c This table represents how propositions correspond to numbers
c    p[1] = 1, p[2] = 2, p[3] = 3, p[4] = 4, p[5] = 5, p[6] = 6, p[7] = 7, p[8] = 8, p[9] = 9, p[10] = 10, p[11] = 11, p[12] = 12, p[13] = 13, p[14] = 14, p[15] = 15, p[16] = 16, p[17] = 17, p[18] = 18, p[19] = 19, p[20] = 20, p[21] = 21, p[22] = 22, p[23] = 23, p[24] = 24, p[25] = 25, p[26] = 26, p[27] = 27, p[28] = 28, p[29] = 29, p[30] = 30, p[31] = 31, p[32] = 32, p[33] = 33, p[34] = 34, p[35] = 35, p[36] = 36, p[37] = 37, p[38] = 38, p[39] = 39, p[40] = 40, p[41] = 41, p[42] = 42, p[43] = 43, p[44] = 44, p[45] = 45, p[46] = 46, p[47] = 47, p[48] = 48, p[49] = 49, p[50] = 50, p[51] = 51, p[52] = 52, p[53] = 53, p[54] = 54, p[55] = 55, p[56] = 56, p[57] = 57, p[58] = 58, p[59] = 59, p[60] = 60, p[61] = 61, p[62] = 62, p[63] = 63, p[64] = 64, p[65] = 65, p[66] = 66, p[67] = 67, p[68] = 68, p[69] = 69, p[70] = 70, p[71] = 71, p[72] = 72, p[73] = 73, p[74] = 74, p[75] = 75, p[76] = 76, p[77] = 77, p[78] = 78, p[79] = 79, p[80] = 80, p[81] = 81, p[82] = 82, p[83] = 83, p[84] = 84, p[85] = 85, p[86] = 86, p[87] = 87, p[88] = 88, p[89] = 89, p[90] = 90, p[91] = 91, p[92] = 92, p[93] = 93, p[94] = 94, p[95] = 95, p[96] = 96, p[97] = 97, p[98] = 98, p[99] = 99, p[100] = 100, p[101] = 101, p[102] = 102, p[103] = 103, p[104] = 104, p[105] = 105, p[106] = 106, p[107] = 107, p[108] = 108, p[109] = 109, p[110] = 110, p[111] = 111, p[112] = 112, p[113] = 113, p[114] = 114, p[115] = 115, p[116] = 116, p[117] = 117, p[118] = 118, p[119] = 119, p[120] = 120, p[121] = 121, p[122] = 122, p[123] = 123, p[124] = 124, p[125] = 125, p[126] = 126, p[127] = 127, p[128] = 128, p[129] = 129, p[130] = 130, p[131] = 131, p[132] = 132, p[133] = 133, p[134] = 134, p[135] = 135, p[136] = 136, p[137] = 137, p[138] = 138, p[139] = 139, p[140] = 140, p[141] = 141, p[142] = 142, p[143] = 143, p[144] = 144, p[145] = 145, p[146] = 146, p[147] = 147, p[148] = 148, p[149] = 149, p[150] = 150, p[151] = 151, p[152] = 152, p[153] = 153, p[154] = 154, p[155] = 155, p[156] = 156, p[157] = 157, p[158] = 158, p[159] = 159, p[160] = 160, p[161] = 161, p[162] = 162, p[163] = 163, p[164] = 164, p[165] = 165, p[166] = 166, p[167] = 167, p[168] = 168, p[169] = 169, p[170] = 170, p[171] = 171, p[172] = 172, p[173] = 173, p[174] = 174, p[175] = 175, p[176] = 176, p[177] = 177, p[178] = 178, p[179] = 179, p[180] = 180, p[181] = 181, p[182] = 182, p[183] = 183, p[184] = 184, p[185] = 185, p[186] = 186, p[187] = 187, p[188] = 188, p[189] = 189, p[190] = 190, p[191] = 191, p[192] = 192, p[193] = 193, p[194] = 194, p[195] = 195, p[196] = 196, p[197] = 197, p[198] = 198, p[199] = 199, p[200] = 200, p[201] = 201, p[202] = 202, p[203] = 203, p[204] = 204, p[205] = 205, p[206] = 206, p[207] = 207, p[208] = 208, p[209] = 209, p[210] = 210, p[211] = 211, p[212] = 212, p[213] = 213, p[214] = 214, p[215] = 215, p[216] = 216, p[217] = 217, p[218] = 218, p[219] = 219, p[220] = 220, p[221] = 221, p[222] = 222, p[223] = 223, p[224] = 224, p[225] = 225, p[226] = 226, p[227] = 227, p[228] = 228, p[229] = 229, p[230] = 230, p[231] = 231, p[232] = 232, p[233] = 233, p[234] = 234, p[235] = 235, p[236] = 236, p[237] = 237, p[238] = 238, p[239] = 239, p[240] = 240, p[241] = 241, p[242] = 242, p[243] = 243, p[244] = 244, p[245] = 245, p[246] = 246, p[247] = 247, p[248] = 248, p[249] = 249, p[250] = 250, p[251] = 251, p[252] = 252, p[253] = 253, p[254] = 254, p[255] = 255, p[256] = 256, p[257] = 257, p[258] = 258, p[259] = 259, p[260] = 260, p[261] = 261, p[262] = 262, p[263] = 263, p[264] = 264, p[265] = 265, p[266] = 266, p[267] = 267, p[268] = 268, p[269] = 269, p[270] = 270, p[271] = 271, p[272] = 272, p[273] = 273, p[274] = 274, p[275] = 275, p[276] = 276, p[277] = 277, p[278] = 278, p[279] = 279, p[280] = 280, p[281] = 281, p[282] = 282, p[283] = 283, p[284] = 284, p[285] = 285, p[286] = 286, p[287] = 287, p[288] = 288, p[289] = 289, p[290] = 290, p[291] = 291, p[292] = 292, p[293] = 293, p[294] = 294, p[295] = 295, p[296] = 296, p[297] = 297, p[298] = 298, p[299] = 299, p[300] = 300, p[301] = 301, p[302] = 302, p[303] = 303, p[304] = 304, p[305] = 305, p[306] = 306, p[307] = 307, p[308] = 308, p[309] = 309, p[310] = 310, p[311] = 311, p[312] = 312, p[313] = 313, p[314] = 314, p[315] = 315, p[316] = 316, p[317] = 317, p[318] = 318, p[319] = 319, p[320] = 320, p[321] = 321, p[322] = 322, p[323] = 323, p[324] = 324, p[325] = 325, p[326] = 326, p[327] = 327, p[328] = 328, p[329] = 329, p[330] = 330, p[331] = 331, p[332] = 332, p[333] = 333, p[334] = 334, p[335] = 335, p[336] = 336, p[337] = 337, p[338] = 338, p[339] = 339, p[340] = 340, p[341] = 341, p[342] = 342, p[343] = 343, p[344] = 344, p[345] = 345, p[346] = 346, p[347] = 347, p[348] = 348, p[349] = 349, p[350] = 350, p[351] = 351, p[352] = 352, p[353] = 353, p[354] = 354, p[355] = 355, p[356] = 356, p[357] = 357, p[358] = 358, p[359] = 359, p[360] = 360, p[361] = 361, p[362] = 362, p[363] = 363, p[364] = 364, p[365] = 365, p[366] = 366, p[367] = 367, p[368] = 368, p[369] = 369, p[370] = 370, p[371] = 371, p[372] = 372, p[373] = 373, p[374] = 374, p[375] = 375, p[376] = 376, p[377] = 377, p[378] = 378, p[379] = 379, p[380] = 380, p[381] = 381, p[382] = 382, p[383] = 383, p[384] = 384, p[385] = 385, p[386] = 386, p[387] = 387, p[388] = 388, p[389] = 389, p[390] = 390, p[391] = 391, p[392] = 392, p[393] = 393, p[394] = 394, p[395] = 395, p[396] = 396, p[397] = 397, p[398] = 398, p[399] = 399, p[400] = 400, p[401] = 401, p[402] = 402, p[403] = 403, p[404] = 404, p[405] = 405, p[406] = 406, p[407] = 407, p[408] = 408, p[409] = 409, p[410] = 410, p[411] = 411, p[412] = 412, p[413] = 413, p[414] = 414, p[415] = 415, p[416] = 416, p[417] = 417, p[418] = 418, p[419] = 419, p[420] = 420, p[421] = 421, p[422] = 422, p[423] = 423, p[424] = 424, p[425] = 425, p[426] = 426, p[427] = 427, p[428] = 428, p[429] = 429, p[430] = 430, p[431] = 431, p[432] = 432, p[433] = 433, p[434] = 434, p[435] = 435, p[436] = 436, p[437] = 437, p[438] = 438, p[439] = 439, p[440] = 440, p[441] = 441, p[442] = 442, p[443] = 443, p[444] = 444, p[445] = 445, p[446] = 446, p[447] = 447, p[448] = 448, p[449] = 449, p[450] = 450, p[451] = 451, p[452] = 452, p[453] = 453, p[454] = 454, p[455] = 455, p[456] = 456, p[457] = 457, p[458] = 458, p[459] = 459, p[460] = 460, p[461] = 461, p[462] = 462, p[463] = 463, p[464] = 464, p[465] = 465, p[466] = 466, p[467] = 467, p[468] = 468, p[469] = 469, p[470] = 470, p[471] = 471, p[472] = 472, p[473] = 473, p[474] = 474, p[475] = 475, p[476] = 476, p[477] = 477, p[478] = 478, p[479] = 479, p[480] = 480, p[481] = 481, p[482] = 482, p[483] = 483, p[484] = 484, p[485] = 485, p[486] = 486, p[487] = 487, p[488] = 488, p[489] = 489, p[490] = 490, p[491] = 491, p[492] = 492, p[493] = 493, p[494] = 494, p[495] = 495, p[496] = 496, p[497] = 497, p[498] = 498, p[499] = 499, p[500] = 500, p[501] = 501, p[502] = 502, p[503] = 503, p[504] = 504, p[505] = 505, p[506] = 506, p[507] = 507, p[508] = 508, p[509] = 509, p[510] = 510, p[511] = 511, p[512] = 512, p[513] = 513, p[514] = 514, p[515] = 515, p[516] = 516, p[517] = 517, p[518] = 518, p[519] = 519, p[520] = 520, p[521] = 521, p[522] = 522, p[523] = 523, p[524] = 524, p[525] = 525, p[526] = 526, p[527] = 527, p[528] = 528, p[529] = 529, p[530] = 530, p[531] = 531, p[532] = 532, p[533] = 533, p[534] = 534, p[535] = 535, p[536] = 536, p[537] = 537, p[538] = 538, p[539] = 539, p[540] = 540, p[541] = 541, p[542] = 542, p[543] = 543, p[544] = 544, p[545] = 545, p[546] = 546, p[547] = 547, p[548] = 548, p[549] = 549, p[550] = 550, p[551] = 551, p[552] = 552, p[553] = 553, p[554] = 554, p[555] = 555, p[556] = 556, p[557] = 557, p[558] = 558, p[559] = 559, p[560] = 560, p[561] = 561, p[562] = 562, p[563] = 563, p[564] = 564, p[565] = 565, p[566] = 566, p[567] = 567, p[568] = 568, p[569] = 569, p[570] = 570, p[571] = 571, p[572] = 572, p[573] = 573, p[574] = 574, p[575] = 575, p[576] = 576, p[577] = 577, p[578] = 578, p[579] = 579, p[580] = 580, p[581] = 581, p[582] = 582, p[583] = 583, p[584] = 584, p[585] = 585, p[586] = 586, p[587] = 587, p[588] = 588, p[589] = 589, p[590] = 590, p[591] = 591, p[592] = 592, p[593] = 593, p[594] = 594, p[595] = 595, p[596] = 596, p[597] = 597, p[598] = 598, p[599] = 599, p[600] = 600, p[601] = 601, p[602] = 602, p[603] = 603, p[604] = 604, p[605] = 605, p[606] = 606, p[607] = 607, p[608] = 608, p[609] = 609, p[610] = 610, p[611] = 611, p[612] = 612, p[613] = 613, p[614] = 614, p[615] = 615, p[616] = 616, p[617] = 617, p[618] = 618, p[619] = 619, p[620] = 620, p[621] = 621, p[622] = 622, p[623] = 623, p[624] = 624, p[625] = 625, p[626] = 626, p[627] = 627, p[628] = 628, p[629] = 629, p[630] = 630, p[631] = 631, p[632] = 632, p[633] = 633, p[634] = 634, p[635] = 635, p[636] = 636, p[637] = 637, p[638] = 638, p[639] = 639, p[640] = 640, p[641] = 641, p[642] = 642, p[643] = 643, p[644] = 644, p[645] = 645, p[646] = 646, p[647] = 647, p[648] = 648, p[649] = 649, p[650] = 650, p[651] = 651, p[652] = 652, p[653] = 653, p[654] = 654, p[655] = 655, p[656] = 656, p[657] = 657, p[658] = 658, p[659] = 659, p[660] = 660, p[661] = 661, p[662] = 662, p[663] = 663, p[664] = 664, p[665] = 665, p[666] = 666, p[667] = 667, p[668] = 668, p[669] = 669, p[670] = 670, p[671] = 671, p[672] = 672, p[673] = 673, p[674] = 674, p[675] = 675, p[676] = 676, p[677] = 677, p[678] = 678, p[679] = 679, p[680] = 680, p[681] = 681, p[682] = 682, p[683] = 683, p[684] = 684, p[685] = 685, p[686] = 686, p[687] = 687, p[688] = 688, p[689] = 689, p[690] = 690, p[691] = 691, p[692] = 692, p[693] = 693, p[694] = 694, p[695] = 695, p[696] = 696, p[697] = 697, p[698] = 698, p[699] = 699, p[700] = 700, p[701] = 701, p[702] = 702, p[703] = 703, p[704] = 704, p[705] = 705, p[706] = 706, p[707] = 707, p[708] = 708, p[709] = 709, p[710] = 710, p[711] = 711, p[712] = 712, p[713] = 713, p[714] = 714, p[715] = 715, p[716] = 716, p[717] = 717, p[718] = 718, p[719] = 719, p[720] = 720, p[721] = 721, p[722] = 722, p[723] = 723, p[724] = 724, p[725] = 725, p[726] = 726, p[727] = 727, p[728] = 728, p[729] = 729, p[730] = 730, p[731] = 731, p[732] = 732, p[733] = 733, p[734] = 734, p[735] = 735, p[736] = 736, p[737] = 737, p[738] = 738, p[739] = 739, p[740] = 740, p[741] = 741, p[742] = 742, p[743] = 743, p[744] = 744, p[745] = 745, p[746] = 746, p[747] = 747, p[748] = 748, p[749] = 749, p[750] = 750, p[751] = 751, p[752] = 752, p[753] = 753, p[754] = 754, p[755] = 755, p[756] = 756, p[757] = 757, p[758] = 758, p[759] = 759, p[760] = 760, p[761] = 761, p[762] = 762, p[763] = 763, p[764] = 764, p[765] = 765, p[766] = 766, p[767] = 767, p[768] = 768, p[769] = 769, p[770] = 770, p[771] = 771, p[772] = 772, p[773] = 773, p[774] = 774, p[775] = 775, p[776] = 776, p[777] = 777, p[778] = 778, p[779] = 779, p[780] = 780, p[781] = 781, p[782] = 782, p[783] = 783, p[784] = 784, p[785] = 785, p[786] = 786, p[787] = 787, p[788] = 788, p[789] = 789, p[790] = 790, p[791] = 791, p[792] = 792, p[793] = 793, p[794] = 794, p[795] = 795, p[796] = 796, p[797] = 797, p[798] = 798, p[799] = 799, p[800] = 800, p[801] = 801, p[802] = 802, p[803] = 803, p[804] = 804, p[805] = 805, p[806] = 806, p[807] = 807, p[808] = 808, p[809] = 809, p[810] = 810, p[811] = 811, p[812] = 812, p[813] = 813, p[814] = 814, p[815] = 815, p[816] = 816, p[817] = 817, p[818] = 818, p[819] = 819, p[820] = 820, p[821] = 821, p[822] = 822, p[823] = 823, p[824] = 824, p[825] = 825, p[826] = 826, p[827] = 827, p[828] = 828, p[829] = 829, p[830] = 830, p[831] = 831, p[832] = 832, p[833] = 833, p[834] = 834, p[835] = 835, p[836] = 836, p[837] = 837, p[838] = 838, p[839] = 839, p[840] = 840, p[841] = 841, p[842] = 842, p[843] = 843, p[844] = 844, p[845] = 845, p[846] = 846, p[847] = 847, p[848] = 848, p[849] = 849, p[850] = 850, p[851] = 851, p[852] = 852, p[853] = 853, p[854] = 854, p[855] = 855, p[856] = 856, p[857] = 857, p[858] = 858, p[859] = 859, p[860] = 860, p[861] = 861, p[862] = 862, p[863] = 863, p[864] = 864, p[865] = 865, p[866] = 866, p[867] = 867, p[868] = 868, p[869] = 869, p[870] = 870, p[871] = 871, p[872] = 872, p[873] = 873, p[874] = 874, p[875] = 875, p[876] = 876, p[877] = 877, p[878] = 878, p[879] = 879, p[880] = 880, p[881] = 881, p[882] = 882, p[883] = 883, p[884] = 884, p[885] = 885, p[886] = 886, p[887] = 887, p[888] = 888, p[889] = 889, p[890] = 890, p[891] = 891, p[892] = 892, p[893] = 893, p[894] = 894, p[895] = 895, p[896] = 896, p[897] = 897, p[898] = 898, p[899] = 899, p[900] = 900, p[901] = 901, p[902] = 902, p[903] = 903, p[904] = 904, p[905] = 905, p[906] = 906, p[907] = 907, p[908] = 908, p[909] = 909, p[910] = 910, p[911] = 911, p[912] = 912, p[913] = 913, p[914] = 914, p[915] = 915, p[916] = 916, p[917] = 917, p[918] = 918, p[919] = 919, p[920] = 920, p[921] = 921, p[922] = 922, p[923] = 923, p[924] = 924, p[925] = 925, p[926] = 926, p[927] = 927, p[928] = 928, p[929] = 929, p[930] = 930, p[931] = 931, p[932] = 932, p[933] = 933, p[934] = 934, p[935] = 935, p[936] = 936, p[937] = 937, p[938] = 938, p[939] = 939, p[940] = 940, p[941] = 941, p[942] = 942, p[943] = 943, p[944] = 944, p[945] = 945, p[946] = 946, p[947] = 947, p[948] = 948, p[949] = 949, p[950] = 950, p[951] = 951, p[952] = 952, p[953] = 953, p[954] = 954, p[955] = 955, p[956] = 956, p[957] = 957, p[958] = 958, p[959] = 959, p[960] = 960, p[961] = 961, p[962] = 962, p[963] = 963, p[964] = 964, p[965] = 965, p[966] = 966, p[967] = 967, p[968] = 968, p[969] = 969, p[970] = 970, p[971] = 971, p[972] = 972, p[973] = 973, p[974] = 974, p[975] = 975, p[976] = 976, p[977] = 977, p[978] = 978, p[979] = 979, p[980] = 980, p[981] = 981, p[982] = 982, p[983] = 983, p[984] = 984, p[985] = 985, p[986] = 986, p[987] = 987, p[988] = 988, p[989] = 989, p[990] = 990, p[991] = 991, p[992] = 992, p[993] = 993, p[994] = 994, p[995] = 995, p[996] = 996, p[997] = 997, p[998] = 998, p[999] = 999, p[1000] = 1000, p[1001] = 1001, p[1002] = 1002, p[1003] = 1003, p[1004] = 1004, p[1005] = 1005, p[1006] = 1006, p[1007] = 1007, p[1008] = 1008, p[1009] = 1009, p[1010] = 1010, p[1011] = 1011, p[1012] = 1012, p[1013] = 1013, p[1014] = 1014, p[1015] = 1015, p[1016] = 1016, p[1017] = 1017, p[1018] = 1018, p[1019] = 1019, p[1020] = 1020, p[1021] = 1021, p[1022] = 1022, p[1023] = 1023, p[1024] = 1024, p[1025] = 1025, p[1026] = 1026, p[1027] = 1027, p[1028] = 1028, p[1029] = 1029, p[1030] = 1030, p[1031] = 1031, p[1032] = 1032, p[1033] = 1033, p[1034] = 1034, p[1035] = 1035, p[1036] = 1036, p[1037] = 1037, p[1038] = 1038, p[1039] = 1039, p[1040] = 1040, p[1041] = 1041, p[1042] = 1042, p[1043] = 1043, p[1044] = 1044, p[1045] = 1045, p[1046] = 1046, p[1047] = 1047, p[1048] = 1048, p[1049] = 1049, p[1050] = 1050, p[1051] = 1051, p[1052] = 1052, p[1053] = 1053, p[1054] = 1054, p[1055] = 1055, p[1056] = 1056, p[1057] = 1057, p[1058] = 1058, p[1059] = 1059, p[1060] = 1060, p[1061] = 1061, p[1062] = 1062, p[1063] = 1063, p[1064] = 1064, p[1065] = 1065, p[1066] = 1066, p[1067] = 1067, p[1068] = 1068, p[1069] = 1069, p[1070] = 1070, p[1071] = 1071, p[1072] = 1072, p[1073] = 1073, p[1074] = 1074, p[1075] = 1075, p[1076] = 1076, p[1077] = 1077, p[1078] = 1078, p[1079] = 1079, p[1080] = 1080, p[1081] = 1081, p[1082] = 1082, p[1083] = 1083, p[1084] = 1084, p[1085] = 1085, p[1086] = 1086, p[1087] = 1087, p[1088] = 1088, p[1089] = 1089, p[1090] = 1090, p[1091] = 1091, p[1092] = 1092, p[1093] = 1093, p[1094] = 1094, p[1095] = 1095, p[1096] = 1096, p[1097] = 1097, p[1098] = 1098, p[1099] = 1099, p[1100] = 1100, p[1101] = 1101, p[1102] = 1102, p[1103] = 1103, p[1104] = 1104, p[1105] = 1105, p[1106] = 1106, p[1107] = 1107, p[1108] = 1108, p[1109] = 1109, p[1110] = 1110, p[1111] = 1111, p[1112] = 1112, p[1113] = 1113, p[1114] = 1114, p[1115] = 1115, p[1116] = 1116, p[1117] = 1117, p[1118] = 1118, p[1119] = 1119, p[1120] = 1120, p[1121] = 1121, p[1122] = 1122, p[1123] = 1123, p[1124] = 1124, p[1125] = 1125, p[1126] = 1126, p[1127] = 1127, p[1128] = 1128, p[1129] = 1129, p[1130] = 1130, p[1131] = 1131, p[1132] = 1132, p[1133] = 1133, p[1134] = 1134, p[1135] = 1135, p[1136] = 1136, p[1137] = 1137, p[1138] = 1138, p[1139] = 1139, p[1140] = 1140, p[1141] = 1141, p[1142] = 1142, p[1143] = 1143, p[1144] = 1144, p[1145] = 1145, p[1146] = 1146, p[1147] = 1147, p[1148] = 1148, p[1149] = 1149, p[1150] = 1150, p[1151] = 1151, p[1152] = 1152, p[1153] = 1153, p[1154] = 1154, p[1155] = 1155, p[1156] = 1156, p[1157] = 1157, p[1158] = 1158, p[1159] = 1159, p[1160] = 1160, p[1161] = 1161, 

c    break = 1162

c    b[1][1][2] = 1163 b[1][1][1] = 1164 b[1][1][0] = 1165 
c    b[1][2][2] = 1166 b[1][2][1] = 1167 b[1][2][0] = 1168 
c    b[1][3][2] = 1169 b[1][3][1] = 1170 b[1][3][0] = 1171 
c    b[1][4][2] = 1172 b[1][4][1] = 1173 b[1][4][0] = 1174 
c    b[1][5][2] = 1175 b[1][5][1] = 1176 b[1][5][0] = 1177 
c    b[1][6][2] = 1178 b[1][6][1] = 1179 b[1][6][0] = 1180 
c    b[1][7][2] = 1181 b[1][7][1] = 1182 b[1][7][0] = 1183 
c    b[1][8][2] = 1184 b[1][8][1] = 1185 b[1][8][0] = 1186 
c    b[1][9][2] = 1187 b[1][9][1] = 1188 b[1][9][0] = 1189 
c    b[1][10][2] = 1190 b[1][10][1] = 1191 b[1][10][0] = 1192 
c    b[1][11][2] = 1193 b[1][11][1] = 1194 b[1][11][0] = 1195 
c    b[1][12][2] = 1196 b[1][12][1] = 1197 b[1][12][0] = 1198 
c    b[1][13][2] = 1199 b[1][13][1] = 1200 b[1][13][0] = 1201 
c    b[1][14][2] = 1202 b[1][14][1] = 1203 b[1][14][0] = 1204 
c    b[1][15][2] = 1205 b[1][15][1] = 1206 b[1][15][0] = 1207 
c    b[1][16][2] = 1208 b[1][16][1] = 1209 b[1][16][0] = 1210 
c    b[1][17][2] = 1211 b[1][17][1] = 1212 b[1][17][0] = 1213 
c    b[1][18][2] = 1214 b[1][18][1] = 1215 b[1][18][0] = 1216 
c    b[1][19][2] = 1217 b[1][19][1] = 1218 b[1][19][0] = 1219 
c    b[1][20][2] = 1220 b[1][20][1] = 1221 b[1][20][0] = 1222 
c    b[1][21][2] = 1223 b[1][21][1] = 1224 b[1][21][0] = 1225 
c    b[1][22][2] = 1226 b[1][22][1] = 1227 b[1][22][0] = 1228 
c    b[1][23][2] = 1229 b[1][23][1] = 1230 b[1][23][0] = 1231 
c    b[1][24][2] = 1232 b[1][24][1] = 1233 b[1][24][0] = 1234 
c    b[1][25][2] = 1235 b[1][25][1] = 1236 b[1][25][0] = 1237 
c    b[1][26][2] = 1238 b[1][26][1] = 1239 b[1][26][0] = 1240 
c    b[1][27][2] = 1241 b[1][27][1] = 1242 b[1][27][0] = 1243 
c    b[1][28][2] = 1244 b[1][28][1] = 1245 b[1][28][0] = 1246 
c    b[1][29][2] = 1247 b[1][29][1] = 1248 b[1][29][0] = 1249 
c    b[1][30][2] = 1250 b[1][30][1] = 1251 b[1][30][0] = 1252 
c    b[1][31][2] = 1253 b[1][31][1] = 1254 b[1][31][0] = 1255 
c    b[1][32][2] = 1256 b[1][32][1] = 1257 b[1][32][0] = 1258 
c    b[1][33][2] = 1259 b[1][33][1] = 1260 b[1][33][0] = 1261 
c    b[1][34][2] = 1262 b[1][34][1] = 1263 b[1][34][0] = 1264 
c    b[1][35][2] = 1265 b[1][35][1] = 1266 b[1][35][0] = 1267 
c    b[1][36][2] = 1268 b[1][36][1] = 1269 b[1][36][0] = 1270 
c    b[1][37][2] = 1271 b[1][37][1] = 1272 b[1][37][0] = 1273 
c    b[1][38][2] = 1274 b[1][38][1] = 1275 b[1][38][0] = 1276 
c    b[1][39][2] = 1277 b[1][39][1] = 1278 b[1][39][0] = 1279 
c    b[1][40][2] = 1280 b[1][40][1] = 1281 b[1][40][0] = 1282 
c    b[1][41][2] = 1283 b[1][41][1] = 1284 b[1][41][0] = 1285 
c    b[1][42][2] = 1286 b[1][42][1] = 1287 b[1][42][0] = 1288 
c    b[1][43][2] = 1289 b[1][43][1] = 1290 b[1][43][0] = 1291 
c    b[1][44][2] = 1292 b[1][44][1] = 1293 b[1][44][0] = 1294 
c    b[1][45][2] = 1295 b[1][45][1] = 1296 b[1][45][0] = 1297 
c    b[1][46][2] = 1298 b[1][46][1] = 1299 b[1][46][0] = 1300 
c    b[1][47][2] = 1301 b[1][47][1] = 1302 b[1][47][0] = 1303 
c    b[1][48][2] = 1304 b[1][48][1] = 1305 b[1][48][0] = 1306 
c    b[1][49][2] = 1307 b[1][49][1] = 1308 b[1][49][0] = 1309 
c    b[1][50][2] = 1310 b[1][50][1] = 1311 b[1][50][0] = 1312 
c    b[1][51][2] = 1313 b[1][51][1] = 1314 b[1][51][0] = 1315 
c    b[1][52][2] = 1316 b[1][52][1] = 1317 b[1][52][0] = 1318 
c    b[1][53][2] = 1319 b[1][53][1] = 1320 b[1][53][0] = 1321 
c    b[1][54][2] = 1322 b[1][54][1] = 1323 b[1][54][0] = 1324 
c    b[1][55][2] = 1325 b[1][55][1] = 1326 b[1][55][0] = 1327 
c    b[1][56][2] = 1328 b[1][56][1] = 1329 b[1][56][0] = 1330 
c    b[1][57][2] = 1331 b[1][57][1] = 1332 b[1][57][0] = 1333 
c    b[1][58][2] = 1334 b[1][58][1] = 1335 b[1][58][0] = 1336 
c    b[1][59][2] = 1337 b[1][59][1] = 1338 b[1][59][0] = 1339 
c    b[1][60][2] = 1340 b[1][60][1] = 1341 b[1][60][0] = 1342 
c    b[1][61][2] = 1343 b[1][61][1] = 1344 b[1][61][0] = 1345 
c    b[1][62][2] = 1346 b[1][62][1] = 1347 b[1][62][0] = 1348 
c    b[1][63][2] = 1349 b[1][63][1] = 1350 b[1][63][0] = 1351 
c    b[1][64][2] = 1352 b[1][64][1] = 1353 b[1][64][0] = 1354 
c    b[1][65][2] = 1355 b[1][65][1] = 1356 b[1][65][0] = 1357 
c    b[1][66][2] = 1358 b[1][66][1] = 1359 b[1][66][0] = 1360 
c    b[1][67][2] = 1361 b[1][67][1] = 1362 b[1][67][0] = 1363 
c    b[1][68][2] = 1364 b[1][68][1] = 1365 b[1][68][0] = 1366 
c    b[1][69][2] = 1367 b[1][69][1] = 1368 b[1][69][0] = 1369 
c    b[1][70][2] = 1370 b[1][70][1] = 1371 b[1][70][0] = 1372 
c    b[1][71][2] = 1373 b[1][71][1] = 1374 b[1][71][0] = 1375 
c    b[1][72][2] = 1376 b[1][72][1] = 1377 b[1][72][0] = 1378 
c    b[1][73][2] = 1379 b[1][73][1] = 1380 b[1][73][0] = 1381 
c    b[1][74][2] = 1382 b[1][74][1] = 1383 b[1][74][0] = 1384 
c    b[1][75][2] = 1385 b[1][75][1] = 1386 b[1][75][0] = 1387 
c    b[1][76][2] = 1388 b[1][76][1] = 1389 b[1][76][0] = 1390 
c    b[1][77][2] = 1391 b[1][77][1] = 1392 b[1][77][0] = 1393 
c    b[1][78][2] = 1394 b[1][78][1] = 1395 b[1][78][0] = 1396 
c    b[1][79][2] = 1397 b[1][79][1] = 1398 b[1][79][0] = 1399 
c    b[1][80][2] = 1400 b[1][80][1] = 1401 b[1][80][0] = 1402 
c    b[1][81][2] = 1403 b[1][81][1] = 1404 b[1][81][0] = 1405 
c    b[1][82][2] = 1406 b[1][82][1] = 1407 b[1][82][0] = 1408 
c    b[1][83][2] = 1409 b[1][83][1] = 1410 b[1][83][0] = 1411 
c    b[1][84][2] = 1412 b[1][84][1] = 1413 b[1][84][0] = 1414 
c    b[1][85][2] = 1415 b[1][85][1] = 1416 b[1][85][0] = 1417 
c    b[1][86][2] = 1418 b[1][86][1] = 1419 b[1][86][0] = 1420 
c    b[1][87][2] = 1421 b[1][87][1] = 1422 b[1][87][0] = 1423 
c    b[1][88][2] = 1424 b[1][88][1] = 1425 b[1][88][0] = 1426 
c    b[1][89][2] = 1427 b[1][89][1] = 1428 b[1][89][0] = 1429 
c    b[1][90][2] = 1430 b[1][90][1] = 1431 b[1][90][0] = 1432 
c    b[1][91][2] = 1433 b[1][91][1] = 1434 b[1][91][0] = 1435 
c    b[1][92][2] = 1436 b[1][92][1] = 1437 b[1][92][0] = 1438 
c    b[1][93][2] = 1439 b[1][93][1] = 1440 b[1][93][0] = 1441 
c    b[1][94][2] = 1442 b[1][94][1] = 1443 b[1][94][0] = 1444 
c    b[1][95][2] = 1445 b[1][95][1] = 1446 b[1][95][0] = 1447 
c    b[1][96][2] = 1448 b[1][96][1] = 1449 b[1][96][0] = 1450 
c    b[1][97][2] = 1451 b[1][97][1] = 1452 b[1][97][0] = 1453 
c    b[1][98][2] = 1454 b[1][98][1] = 1455 b[1][98][0] = 1456 
c    b[1][99][2] = 1457 b[1][99][1] = 1458 b[1][99][0] = 1459 
c    b[1][100][2] = 1460 b[1][100][1] = 1461 b[1][100][0] = 1462 
c    b[1][101][2] = 1463 b[1][101][1] = 1464 b[1][101][0] = 1465 
c    b[1][102][2] = 1466 b[1][102][1] = 1467 b[1][102][0] = 1468 
c    b[1][103][2] = 1469 b[1][103][1] = 1470 b[1][103][0] = 1471 
c    b[1][104][2] = 1472 b[1][104][1] = 1473 b[1][104][0] = 1474 
c    b[1][105][2] = 1475 b[1][105][1] = 1476 b[1][105][0] = 1477 
c    b[1][106][2] = 1478 b[1][106][1] = 1479 b[1][106][0] = 1480 
c    b[1][107][2] = 1481 b[1][107][1] = 1482 b[1][107][0] = 1483 
c    b[1][108][2] = 1484 b[1][108][1] = 1485 b[1][108][0] = 1486 
c    b[1][109][2] = 1487 b[1][109][1] = 1488 b[1][109][0] = 1489 
c    b[1][110][2] = 1490 b[1][110][1] = 1491 b[1][110][0] = 1492 
c    b[1][111][2] = 1493 b[1][111][1] = 1494 b[1][111][0] = 1495 
c    b[1][112][2] = 1496 b[1][112][1] = 1497 b[1][112][0] = 1498 
c    b[1][113][2] = 1499 b[1][113][1] = 1500 b[1][113][0] = 1501 
c    b[1][114][2] = 1502 b[1][114][1] = 1503 b[1][114][0] = 1504 
c    b[1][115][2] = 1505 b[1][115][1] = 1506 b[1][115][0] = 1507 
c    b[1][116][2] = 1508 b[1][116][1] = 1509 b[1][116][0] = 1510 
c    b[1][117][2] = 1511 b[1][117][1] = 1512 b[1][117][0] = 1513 
c    b[1][118][2] = 1514 b[1][118][1] = 1515 b[1][118][0] = 1516 
c    b[1][119][2] = 1517 b[1][119][1] = 1518 b[1][119][0] = 1519 
c    b[1][120][2] = 1520 b[1][120][1] = 1521 b[1][120][0] = 1522 
c    b[1][121][2] = 1523 b[1][121][1] = 1524 b[1][121][0] = 1525 
c    b[1][122][2] = 1526 b[1][122][1] = 1527 b[1][122][0] = 1528 
c    b[1][123][2] = 1529 b[1][123][1] = 1530 b[1][123][0] = 1531 
c    b[1][124][2] = 1532 b[1][124][1] = 1533 b[1][124][0] = 1534 
c    b[1][125][2] = 1535 b[1][125][1] = 1536 b[1][125][0] = 1537 
c    b[1][126][2] = 1538 b[1][126][1] = 1539 b[1][126][0] = 1540 
c    b[1][127][2] = 1541 b[1][127][1] = 1542 b[1][127][0] = 1543 
c    b[1][128][2] = 1544 b[1][128][1] = 1545 b[1][128][0] = 1546 
c    b[1][129][2] = 1547 b[1][129][1] = 1548 b[1][129][0] = 1549 
c    b[1][130][2] = 1550 b[1][130][1] = 1551 b[1][130][0] = 1552 
c    b[1][131][2] = 1553 b[1][131][1] = 1554 b[1][131][0] = 1555 
c    b[1][132][2] = 1556 b[1][132][1] = 1557 b[1][132][0] = 1558 
c    b[1][133][2] = 1559 b[1][133][1] = 1560 b[1][133][0] = 1561 
c    b[1][134][2] = 1562 b[1][134][1] = 1563 b[1][134][0] = 1564 
c    b[1][135][2] = 1565 b[1][135][1] = 1566 b[1][135][0] = 1567 
c    b[1][136][2] = 1568 b[1][136][1] = 1569 b[1][136][0] = 1570 
c    b[1][137][2] = 1571 b[1][137][1] = 1572 b[1][137][0] = 1573 
c    b[1][138][2] = 1574 b[1][138][1] = 1575 b[1][138][0] = 1576 
c    b[1][139][2] = 1577 b[1][139][1] = 1578 b[1][139][0] = 1579 
c    b[1][140][2] = 1580 b[1][140][1] = 1581 b[1][140][0] = 1582 
c    b[1][141][2] = 1583 b[1][141][1] = 1584 b[1][141][0] = 1585 
c    b[1][142][2] = 1586 b[1][142][1] = 1587 b[1][142][0] = 1588 
c    b[1][143][2] = 1589 b[1][143][1] = 1590 b[1][143][0] = 1591 
c    b[1][144][2] = 1592 b[1][144][1] = 1593 b[1][144][0] = 1594 
c    b[1][145][2] = 1595 b[1][145][1] = 1596 b[1][145][0] = 1597 
c    b[1][146][2] = 1598 b[1][146][1] = 1599 b[1][146][0] = 1600 
c    b[1][147][2] = 1601 b[1][147][1] = 1602 b[1][147][0] = 1603 
c    b[1][148][2] = 1604 b[1][148][1] = 1605 b[1][148][0] = 1606 
c    b[1][149][2] = 1607 b[1][149][1] = 1608 b[1][149][0] = 1609 
c    b[1][150][2] = 1610 b[1][150][1] = 1611 b[1][150][0] = 1612 
c    b[1][151][2] = 1613 b[1][151][1] = 1614 b[1][151][0] = 1615 
c    b[1][152][2] = 1616 b[1][152][1] = 1617 b[1][152][0] = 1618 
c    b[1][153][2] = 1619 b[1][153][1] = 1620 b[1][153][0] = 1621 
c    b[1][154][2] = 1622 b[1][154][1] = 1623 b[1][154][0] = 1624 
c    b[1][155][2] = 1625 b[1][155][1] = 1626 b[1][155][0] = 1627 
c    b[1][156][2] = 1628 b[1][156][1] = 1629 b[1][156][0] = 1630 
c    b[1][157][2] = 1631 b[1][157][1] = 1632 b[1][157][0] = 1633 
c    b[1][158][2] = 1634 b[1][158][1] = 1635 b[1][158][0] = 1636 
c    b[1][159][2] = 1637 b[1][159][1] = 1638 b[1][159][0] = 1639 
c    b[1][160][2] = 1640 b[1][160][1] = 1641 b[1][160][0] = 1642 
c    b[1][161][2] = 1643 b[1][161][1] = 1644 b[1][161][0] = 1645 
c    b[1][162][2] = 1646 b[1][162][1] = 1647 b[1][162][0] = 1648 
c    b[1][163][2] = 1649 b[1][163][1] = 1650 b[1][163][0] = 1651 
c    b[1][164][2] = 1652 b[1][164][1] = 1653 b[1][164][0] = 1654 
c    b[1][165][2] = 1655 b[1][165][1] = 1656 b[1][165][0] = 1657 
c    b[1][166][2] = 1658 b[1][166][1] = 1659 b[1][166][0] = 1660 
c    b[1][167][2] = 1661 b[1][167][1] = 1662 b[1][167][0] = 1663 
c    b[1][168][2] = 1664 b[1][168][1] = 1665 b[1][168][0] = 1666 
c    b[1][169][2] = 1667 b[1][169][1] = 1668 b[1][169][0] = 1669 
c    b[1][170][2] = 1670 b[1][170][1] = 1671 b[1][170][0] = 1672 
c    b[1][171][2] = 1673 b[1][171][1] = 1674 b[1][171][0] = 1675 
c    b[1][172][2] = 1676 b[1][172][1] = 1677 b[1][172][0] = 1678 
c    b[1][173][2] = 1679 b[1][173][1] = 1680 b[1][173][0] = 1681 
c    b[1][174][2] = 1682 b[1][174][1] = 1683 b[1][174][0] = 1684 
c    b[1][175][2] = 1685 b[1][175][1] = 1686 b[1][175][0] = 1687 
c    b[1][176][2] = 1688 b[1][176][1] = 1689 b[1][176][0] = 1690 
c    b[1][177][2] = 1691 b[1][177][1] = 1692 b[1][177][0] = 1693 
c    b[1][178][2] = 1694 b[1][178][1] = 1695 b[1][178][0] = 1696 
c    b[1][179][2] = 1697 b[1][179][1] = 1698 b[1][179][0] = 1699 
c    b[1][180][2] = 1700 b[1][180][1] = 1701 b[1][180][0] = 1702 
c    b[1][181][2] = 1703 b[1][181][1] = 1704 b[1][181][0] = 1705 
c    b[1][182][2] = 1706 b[1][182][1] = 1707 b[1][182][0] = 1708 
c    b[1][183][2] = 1709 b[1][183][1] = 1710 b[1][183][0] = 1711 
c    b[1][184][2] = 1712 b[1][184][1] = 1713 b[1][184][0] = 1714 
c    b[1][185][2] = 1715 b[1][185][1] = 1716 b[1][185][0] = 1717 
c    b[1][186][2] = 1718 b[1][186][1] = 1719 b[1][186][0] = 1720 
c    b[1][187][2] = 1721 b[1][187][1] = 1722 b[1][187][0] = 1723 
c    b[1][188][2] = 1724 b[1][188][1] = 1725 b[1][188][0] = 1726 
c    b[1][189][2] = 1727 b[1][189][1] = 1728 b[1][189][0] = 1729 
c    b[1][190][2] = 1730 b[1][190][1] = 1731 b[1][190][0] = 1732 
c    b[1][191][2] = 1733 b[1][191][1] = 1734 b[1][191][0] = 1735 
c    b[1][192][2] = 1736 b[1][192][1] = 1737 b[1][192][0] = 1738 
c    b[1][193][2] = 1739 b[1][193][1] = 1740 b[1][193][0] = 1741 
c    b[1][194][2] = 1742 b[1][194][1] = 1743 b[1][194][0] = 1744 
c    b[1][195][2] = 1745 b[1][195][1] = 1746 b[1][195][0] = 1747 
c    b[1][196][2] = 1748 b[1][196][1] = 1749 b[1][196][0] = 1750 
c    b[1][197][2] = 1751 b[1][197][1] = 1752 b[1][197][0] = 1753 
c    b[1][198][2] = 1754 b[1][198][1] = 1755 b[1][198][0] = 1756 
c    b[1][199][2] = 1757 b[1][199][1] = 1758 b[1][199][0] = 1759 
c    b[1][200][2] = 1760 b[1][200][1] = 1761 b[1][200][0] = 1762 
c    b[1][201][2] = 1763 b[1][201][1] = 1764 b[1][201][0] = 1765 
c    b[1][202][2] = 1766 b[1][202][1] = 1767 b[1][202][0] = 1768 
c    b[1][203][2] = 1769 b[1][203][1] = 1770 b[1][203][0] = 1771 
c    b[1][204][2] = 1772 b[1][204][1] = 1773 b[1][204][0] = 1774 
c    b[1][205][2] = 1775 b[1][205][1] = 1776 b[1][205][0] = 1777 
c    b[1][206][2] = 1778 b[1][206][1] = 1779 b[1][206][0] = 1780 
c    b[1][207][2] = 1781 b[1][207][1] = 1782 b[1][207][0] = 1783 
c    b[1][208][2] = 1784 b[1][208][1] = 1785 b[1][208][0] = 1786 
c    b[1][209][2] = 1787 b[1][209][1] = 1788 b[1][209][0] = 1789 
c    b[1][210][2] = 1790 b[1][210][1] = 1791 b[1][210][0] = 1792 
c    b[1][211][2] = 1793 b[1][211][1] = 1794 b[1][211][0] = 1795 
c    b[1][212][2] = 1796 b[1][212][1] = 1797 b[1][212][0] = 1798 
c    b[1][213][2] = 1799 b[1][213][1] = 1800 b[1][213][0] = 1801 
c    b[1][214][2] = 1802 b[1][214][1] = 1803 b[1][214][0] = 1804 
c    b[1][215][2] = 1805 b[1][215][1] = 1806 b[1][215][0] = 1807 
c    b[1][216][2] = 1808 b[1][216][1] = 1809 b[1][216][0] = 1810 
c    b[1][217][2] = 1811 b[1][217][1] = 1812 b[1][217][0] = 1813 
c    b[1][218][2] = 1814 b[1][218][1] = 1815 b[1][218][0] = 1816 
c    b[1][219][2] = 1817 b[1][219][1] = 1818 b[1][219][0] = 1819 
c    b[1][220][2] = 1820 b[1][220][1] = 1821 b[1][220][0] = 1822 
c    b[1][221][2] = 1823 b[1][221][1] = 1824 b[1][221][0] = 1825 
c    b[1][222][2] = 1826 b[1][222][1] = 1827 b[1][222][0] = 1828 
c    b[1][223][2] = 1829 b[1][223][1] = 1830 b[1][223][0] = 1831 
c    b[1][224][2] = 1832 b[1][224][1] = 1833 b[1][224][0] = 1834 
c    b[1][225][2] = 1835 b[1][225][1] = 1836 b[1][225][0] = 1837 
c    b[1][226][2] = 1838 b[1][226][1] = 1839 b[1][226][0] = 1840 
c    b[1][227][2] = 1841 b[1][227][1] = 1842 b[1][227][0] = 1843 
c    b[1][228][2] = 1844 b[1][228][1] = 1845 b[1][228][0] = 1846 
c    b[1][229][2] = 1847 b[1][229][1] = 1848 b[1][229][0] = 1849 
c    b[1][230][2] = 1850 b[1][230][1] = 1851 b[1][230][0] = 1852 
c    b[1][231][2] = 1853 b[1][231][1] = 1854 b[1][231][0] = 1855 
c    b[1][232][2] = 1856 b[1][232][1] = 1857 b[1][232][0] = 1858 
c    b[1][233][2] = 1859 b[1][233][1] = 1860 b[1][233][0] = 1861 
c    b[1][234][2] = 1862 b[1][234][1] = 1863 b[1][234][0] = 1864 
c    b[1][235][2] = 1865 b[1][235][1] = 1866 b[1][235][0] = 1867 
c    b[1][236][2] = 1868 b[1][236][1] = 1869 b[1][236][0] = 1870 
c    b[1][237][2] = 1871 b[1][237][1] = 1872 b[1][237][0] = 1873 
c    b[1][238][2] = 1874 b[1][238][1] = 1875 b[1][238][0] = 1876 
c    b[1][239][2] = 1877 b[1][239][1] = 1878 b[1][239][0] = 1879 
c    b[1][240][2] = 1880 b[1][240][1] = 1881 b[1][240][0] = 1882 
c    b[1][241][2] = 1883 b[1][241][1] = 1884 b[1][241][0] = 1885 
c    b[1][242][2] = 1886 b[1][242][1] = 1887 b[1][242][0] = 1888 
c    b[1][243][2] = 1889 b[1][243][1] = 1890 b[1][243][0] = 1891 
c    b[1][244][2] = 1892 b[1][244][1] = 1893 b[1][244][0] = 1894 
c    b[1][245][2] = 1895 b[1][245][1] = 1896 b[1][245][0] = 1897 
c    b[1][246][2] = 1898 b[1][246][1] = 1899 b[1][246][0] = 1900 
c    b[1][247][2] = 1901 b[1][247][1] = 1902 b[1][247][0] = 1903 
c    b[1][248][2] = 1904 b[1][248][1] = 1905 b[1][248][0] = 1906 
c    b[1][249][2] = 1907 b[1][249][1] = 1908 b[1][249][0] = 1909 
c    b[1][250][2] = 1910 b[1][250][1] = 1911 b[1][250][0] = 1912 
c    b[1][251][2] = 1913 b[1][251][1] = 1914 b[1][251][0] = 1915 
c    b[1][252][2] = 1916 b[1][252][1] = 1917 b[1][252][0] = 1918 
c    b[1][253][2] = 1919 b[1][253][1] = 1920 b[1][253][0] = 1921 
c    b[1][254][2] = 1922 b[1][254][1] = 1923 b[1][254][0] = 1924 
c    b[1][255][2] = 1925 b[1][255][1] = 1926 b[1][255][0] = 1927 
c    b[1][256][2] = 1928 b[1][256][1] = 1929 b[1][256][0] = 1930 
c    b[1][257][2] = 1931 b[1][257][1] = 1932 b[1][257][0] = 1933 
c    b[1][258][2] = 1934 b[1][258][1] = 1935 b[1][258][0] = 1936 
c    b[1][259][2] = 1937 b[1][259][1] = 1938 b[1][259][0] = 1939 
c    b[1][260][2] = 1940 b[1][260][1] = 1941 b[1][260][0] = 1942 
c    b[1][261][2] = 1943 b[1][261][1] = 1944 b[1][261][0] = 1945 
c    b[1][262][2] = 1946 b[1][262][1] = 1947 b[1][262][0] = 1948 
c    b[1][263][2] = 1949 b[1][263][1] = 1950 b[1][263][0] = 1951 
c    b[1][264][2] = 1952 b[1][264][1] = 1953 b[1][264][0] = 1954 
c    b[1][265][2] = 1955 b[1][265][1] = 1956 b[1][265][0] = 1957 
c    b[1][266][2] = 1958 b[1][266][1] = 1959 b[1][266][0] = 1960 
c    b[1][267][2] = 1961 b[1][267][1] = 1962 b[1][267][0] = 1963 
c    b[1][268][2] = 1964 b[1][268][1] = 1965 b[1][268][0] = 1966 
c    b[1][269][2] = 1967 b[1][269][1] = 1968 b[1][269][0] = 1969 
c    b[1][270][2] = 1970 b[1][270][1] = 1971 b[1][270][0] = 1972 
c    b[1][271][2] = 1973 b[1][271][1] = 1974 b[1][271][0] = 1975 
c    b[1][272][2] = 1976 b[1][272][1] = 1977 b[1][272][0] = 1978 
c    b[1][273][2] = 1979 b[1][273][1] = 1980 b[1][273][0] = 1981 
c    b[1][274][2] = 1982 b[1][274][1] = 1983 b[1][274][0] = 1984 
c    b[1][275][2] = 1985 b[1][275][1] = 1986 b[1][275][0] = 1987 
c    b[1][276][2] = 1988 b[1][276][1] = 1989 b[1][276][0] = 1990 
c    b[1][277][2] = 1991 b[1][277][1] = 1992 b[1][277][0] = 1993 
c    b[1][278][2] = 1994 b[1][278][1] = 1995 b[1][278][0] = 1996 
c    b[1][279][2] = 1997 b[1][279][1] = 1998 b[1][279][0] = 1999 
c    b[1][280][2] = 2000 b[1][280][1] = 2001 b[1][280][0] = 2002 
c    b[1][281][2] = 2003 b[1][281][1] = 2004 b[1][281][0] = 2005 
c    b[1][282][2] = 2006 b[1][282][1] = 2007 b[1][282][0] = 2008 
c    b[1][283][2] = 2009 b[1][283][1] = 2010 b[1][283][0] = 2011 
c    b[1][284][2] = 2012 b[1][284][1] = 2013 b[1][284][0] = 2014 
c    b[1][285][2] = 2015 b[1][285][1] = 2016 b[1][285][0] = 2017 
c    b[1][286][2] = 2018 b[1][286][1] = 2019 b[1][286][0] = 2020 
c    b[1][287][2] = 2021 b[1][287][1] = 2022 b[1][287][0] = 2023 
c    b[1][288][2] = 2024 b[1][288][1] = 2025 b[1][288][0] = 2026 
c    b[1][289][2] = 2027 b[1][289][1] = 2028 b[1][289][0] = 2029 
c    b[1][290][2] = 2030 b[1][290][1] = 2031 b[1][290][0] = 2032 
c    b[1][291][2] = 2033 b[1][291][1] = 2034 b[1][291][0] = 2035 
c    b[1][292][2] = 2036 b[1][292][1] = 2037 b[1][292][0] = 2038 
c    b[1][293][2] = 2039 b[1][293][1] = 2040 b[1][293][0] = 2041 
c    b[1][294][2] = 2042 b[1][294][1] = 2043 b[1][294][0] = 2044 
c    b[1][295][2] = 2045 b[1][295][1] = 2046 b[1][295][0] = 2047 
c    b[1][296][2] = 2048 b[1][296][1] = 2049 b[1][296][0] = 2050 
c    b[1][297][2] = 2051 b[1][297][1] = 2052 b[1][297][0] = 2053 
c    b[1][298][2] = 2054 b[1][298][1] = 2055 b[1][298][0] = 2056 
c    b[1][299][2] = 2057 b[1][299][1] = 2058 b[1][299][0] = 2059 
c    b[1][300][2] = 2060 b[1][300][1] = 2061 b[1][300][0] = 2062 
c    b[1][301][2] = 2063 b[1][301][1] = 2064 b[1][301][0] = 2065 
c    b[1][302][2] = 2066 b[1][302][1] = 2067 b[1][302][0] = 2068 
c    b[1][303][2] = 2069 b[1][303][1] = 2070 b[1][303][0] = 2071 
c    b[1][304][2] = 2072 b[1][304][1] = 2073 b[1][304][0] = 2074 
c    b[1][305][2] = 2075 b[1][305][1] = 2076 b[1][305][0] = 2077 
c    b[1][306][2] = 2078 b[1][306][1] = 2079 b[1][306][0] = 2080 
c    b[1][307][2] = 2081 b[1][307][1] = 2082 b[1][307][0] = 2083 
c    b[1][308][2] = 2084 b[1][308][1] = 2085 b[1][308][0] = 2086 
c    b[1][309][2] = 2087 b[1][309][1] = 2088 b[1][309][0] = 2089 
c    b[1][310][2] = 2090 b[1][310][1] = 2091 b[1][310][0] = 2092 
c    b[1][311][2] = 2093 b[1][311][1] = 2094 b[1][311][0] = 2095 
c    b[1][312][2] = 2096 b[1][312][1] = 2097 b[1][312][0] = 2098 
c    b[1][313][2] = 2099 b[1][313][1] = 2100 b[1][313][0] = 2101 
c    b[1][314][2] = 2102 b[1][314][1] = 2103 b[1][314][0] = 2104 
c    b[1][315][2] = 2105 b[1][315][1] = 2106 b[1][315][0] = 2107 
c    b[1][316][2] = 2108 b[1][316][1] = 2109 b[1][316][0] = 2110 
c    b[1][317][2] = 2111 b[1][317][1] = 2112 b[1][317][0] = 2113 
c    b[1][318][2] = 2114 b[1][318][1] = 2115 b[1][318][0] = 2116 
c    b[1][319][2] = 2117 b[1][319][1] = 2118 b[1][319][0] = 2119 
c    b[1][320][2] = 2120 b[1][320][1] = 2121 b[1][320][0] = 2122 
c    b[1][321][2] = 2123 b[1][321][1] = 2124 b[1][321][0] = 2125 
c    b[1][322][2] = 2126 b[1][322][1] = 2127 b[1][322][0] = 2128 
c    b[1][323][2] = 2129 b[1][323][1] = 2130 b[1][323][0] = 2131 
c    b[1][324][2] = 2132 b[1][324][1] = 2133 b[1][324][0] = 2134 
c    b[1][325][2] = 2135 b[1][325][1] = 2136 b[1][325][0] = 2137 
c    b[1][326][2] = 2138 b[1][326][1] = 2139 b[1][326][0] = 2140 
c    b[1][327][2] = 2141 b[1][327][1] = 2142 b[1][327][0] = 2143 
c    b[1][328][2] = 2144 b[1][328][1] = 2145 b[1][328][0] = 2146 
c    b[1][329][2] = 2147 b[1][329][1] = 2148 b[1][329][0] = 2149 
c    b[1][330][2] = 2150 b[1][330][1] = 2151 b[1][330][0] = 2152 
c    b[1][331][2] = 2153 b[1][331][1] = 2154 b[1][331][0] = 2155 
c    b[1][332][2] = 2156 b[1][332][1] = 2157 b[1][332][0] = 2158 
c    b[1][333][2] = 2159 b[1][333][1] = 2160 b[1][333][0] = 2161 
c    b[1][334][2] = 2162 b[1][334][1] = 2163 b[1][334][0] = 2164 
c    b[1][335][2] = 2165 b[1][335][1] = 2166 b[1][335][0] = 2167 
c    b[1][336][2] = 2168 b[1][336][1] = 2169 b[1][336][0] = 2170 
c    b[1][337][2] = 2171 b[1][337][1] = 2172 b[1][337][0] = 2173 
c    b[1][338][2] = 2174 b[1][338][1] = 2175 b[1][338][0] = 2176 
c    b[1][339][2] = 2177 b[1][339][1] = 2178 b[1][339][0] = 2179 
c    b[1][340][2] = 2180 b[1][340][1] = 2181 b[1][340][0] = 2182 
c    b[1][341][2] = 2183 b[1][341][1] = 2184 b[1][341][0] = 2185 
c    b[1][342][2] = 2186 b[1][342][1] = 2187 b[1][342][0] = 2188 
c    b[1][343][2] = 2189 b[1][343][1] = 2190 b[1][343][0] = 2191 
c    b[1][344][2] = 2192 b[1][344][1] = 2193 b[1][344][0] = 2194 
c    b[1][345][2] = 2195 b[1][345][1] = 2196 b[1][345][0] = 2197 
c    b[1][346][2] = 2198 b[1][346][1] = 2199 b[1][346][0] = 2200 
c    b[1][347][2] = 2201 b[1][347][1] = 2202 b[1][347][0] = 2203 
c    b[1][348][2] = 2204 b[1][348][1] = 2205 b[1][348][0] = 2206 
c    b[1][349][2] = 2207 b[1][349][1] = 2208 b[1][349][0] = 2209 
c    b[1][350][2] = 2210 b[1][350][1] = 2211 b[1][350][0] = 2212 
c    b[1][351][2] = 2213 b[1][351][1] = 2214 b[1][351][0] = 2215 
c    b[1][352][2] = 2216 b[1][352][1] = 2217 b[1][352][0] = 2218 
c    b[1][353][2] = 2219 b[1][353][1] = 2220 b[1][353][0] = 2221 
c    b[1][354][2] = 2222 b[1][354][1] = 2223 b[1][354][0] = 2224 
c    b[1][355][2] = 2225 b[1][355][1] = 2226 b[1][355][0] = 2227 
c    b[1][356][2] = 2228 b[1][356][1] = 2229 b[1][356][0] = 2230 
c    b[1][357][2] = 2231 b[1][357][1] = 2232 b[1][357][0] = 2233 
c    b[1][358][2] = 2234 b[1][358][1] = 2235 b[1][358][0] = 2236 
c    b[1][359][2] = 2237 b[1][359][1] = 2238 b[1][359][0] = 2239 
c    b[1][360][2] = 2240 b[1][360][1] = 2241 b[1][360][0] = 2242 
c    b[1][361][2] = 2243 b[1][361][1] = 2244 b[1][361][0] = 2245 
c    b[1][362][2] = 2246 b[1][362][1] = 2247 b[1][362][0] = 2248 
c    b[1][363][2] = 2249 b[1][363][1] = 2250 b[1][363][0] = 2251 
c    b[1][364][2] = 2252 b[1][364][1] = 2253 b[1][364][0] = 2254 
c    b[1][365][2] = 2255 b[1][365][1] = 2256 b[1][365][0] = 2257 
c    b[1][366][2] = 2258 b[1][366][1] = 2259 b[1][366][0] = 2260 
c    b[1][367][2] = 2261 b[1][367][1] = 2262 b[1][367][0] = 2263 
c    b[1][368][2] = 2264 b[1][368][1] = 2265 b[1][368][0] = 2266 
c    b[1][369][2] = 2267 b[1][369][1] = 2268 b[1][369][0] = 2269 
c    b[1][370][2] = 2270 b[1][370][1] = 2271 b[1][370][0] = 2272 
c    b[1][371][2] = 2273 b[1][371][1] = 2274 b[1][371][0] = 2275 
c    b[1][372][2] = 2276 b[1][372][1] = 2277 b[1][372][0] = 2278 
c    b[1][373][2] = 2279 b[1][373][1] = 2280 b[1][373][0] = 2281 
c    b[1][374][2] = 2282 b[1][374][1] = 2283 b[1][374][0] = 2284 
c    b[1][375][2] = 2285 b[1][375][1] = 2286 b[1][375][0] = 2287 
c    b[1][376][2] = 2288 b[1][376][1] = 2289 b[1][376][0] = 2290 
c    b[1][377][2] = 2291 b[1][377][1] = 2292 b[1][377][0] = 2293 
c    b[1][378][2] = 2294 b[1][378][1] = 2295 b[1][378][0] = 2296 
c    b[1][379][2] = 2297 b[1][379][1] = 2298 b[1][379][0] = 2299 
c    b[1][380][2] = 2300 b[1][380][1] = 2301 b[1][380][0] = 2302 
c    b[1][381][2] = 2303 b[1][381][1] = 2304 b[1][381][0] = 2305 
c    b[1][382][2] = 2306 b[1][382][1] = 2307 b[1][382][0] = 2308 
c    b[1][383][2] = 2309 b[1][383][1] = 2310 b[1][383][0] = 2311 
c    b[1][384][2] = 2312 b[1][384][1] = 2313 b[1][384][0] = 2314 
c    b[1][385][2] = 2315 b[1][385][1] = 2316 b[1][385][0] = 2317 
c    b[1][386][2] = 2318 b[1][386][1] = 2319 b[1][386][0] = 2320 
c    b[1][387][2] = 2321 b[1][387][1] = 2322 b[1][387][0] = 2323 
c    b[1][388][2] = 2324 b[1][388][1] = 2325 b[1][388][0] = 2326 
c    b[1][389][2] = 2327 b[1][389][1] = 2328 b[1][389][0] = 2329 
c    b[1][390][2] = 2330 b[1][390][1] = 2331 b[1][390][0] = 2332 
c    b[1][391][2] = 2333 b[1][391][1] = 2334 b[1][391][0] = 2335 
c    b[1][392][2] = 2336 b[1][392][1] = 2337 b[1][392][0] = 2338 
c    b[1][393][2] = 2339 b[1][393][1] = 2340 b[1][393][0] = 2341 
c    b[1][394][2] = 2342 b[1][394][1] = 2343 b[1][394][0] = 2344 
c    b[1][395][2] = 2345 b[1][395][1] = 2346 b[1][395][0] = 2347 
c    b[1][396][2] = 2348 b[1][396][1] = 2349 b[1][396][0] = 2350 
c    b[1][397][2] = 2351 b[1][397][1] = 2352 b[1][397][0] = 2353 
c    b[1][398][2] = 2354 b[1][398][1] = 2355 b[1][398][0] = 2356 
c    b[1][399][2] = 2357 b[1][399][1] = 2358 b[1][399][0] = 2359 
c    b[1][400][2] = 2360 b[1][400][1] = 2361 b[1][400][0] = 2362 
c    b[1][401][2] = 2363 b[1][401][1] = 2364 b[1][401][0] = 2365 
c    b[1][402][2] = 2366 b[1][402][1] = 2367 b[1][402][0] = 2368 
c    b[1][403][2] = 2369 b[1][403][1] = 2370 b[1][403][0] = 2371 
c    b[1][404][2] = 2372 b[1][404][1] = 2373 b[1][404][0] = 2374 
c    b[1][405][2] = 2375 b[1][405][1] = 2376 b[1][405][0] = 2377 
c    b[1][406][2] = 2378 b[1][406][1] = 2379 b[1][406][0] = 2380 
c    b[1][407][2] = 2381 b[1][407][1] = 2382 b[1][407][0] = 2383 
c    b[1][408][2] = 2384 b[1][408][1] = 2385 b[1][408][0] = 2386 
c    b[1][409][2] = 2387 b[1][409][1] = 2388 b[1][409][0] = 2389 
c    b[1][410][2] = 2390 b[1][410][1] = 2391 b[1][410][0] = 2392 
c    b[1][411][2] = 2393 b[1][411][1] = 2394 b[1][411][0] = 2395 
c    b[1][412][2] = 2396 b[1][412][1] = 2397 b[1][412][0] = 2398 
c    b[1][413][2] = 2399 b[1][413][1] = 2400 b[1][413][0] = 2401 
c    b[1][414][2] = 2402 b[1][414][1] = 2403 b[1][414][0] = 2404 
c    b[1][415][2] = 2405 b[1][415][1] = 2406 b[1][415][0] = 2407 
c    b[1][416][2] = 2408 b[1][416][1] = 2409 b[1][416][0] = 2410 
c    b[1][417][2] = 2411 b[1][417][1] = 2412 b[1][417][0] = 2413 
c    b[1][418][2] = 2414 b[1][418][1] = 2415 b[1][418][0] = 2416 
c    b[1][419][2] = 2417 b[1][419][1] = 2418 b[1][419][0] = 2419 
c    b[1][420][2] = 2420 b[1][420][1] = 2421 b[1][420][0] = 2422 
c    b[1][421][2] = 2423 b[1][421][1] = 2424 b[1][421][0] = 2425 
c    b[1][422][2] = 2426 b[1][422][1] = 2427 b[1][422][0] = 2428 
c    b[1][423][2] = 2429 b[1][423][1] = 2430 b[1][423][0] = 2431 
c    b[1][424][2] = 2432 b[1][424][1] = 2433 b[1][424][0] = 2434 
c    b[1][425][2] = 2435 b[1][425][1] = 2436 b[1][425][0] = 2437 
c    b[1][426][2] = 2438 b[1][426][1] = 2439 b[1][426][0] = 2440 
c    b[1][427][2] = 2441 b[1][427][1] = 2442 b[1][427][0] = 2443 
c    b[1][428][2] = 2444 b[1][428][1] = 2445 b[1][428][0] = 2446 
c    b[1][429][2] = 2447 b[1][429][1] = 2448 b[1][429][0] = 2449 
c    b[1][430][2] = 2450 b[1][430][1] = 2451 b[1][430][0] = 2452 
c    b[1][431][2] = 2453 b[1][431][1] = 2454 b[1][431][0] = 2455 
c    b[1][432][2] = 2456 b[1][432][1] = 2457 b[1][432][0] = 2458 
c    b[1][433][2] = 2459 b[1][433][1] = 2460 b[1][433][0] = 2461 
c    b[1][434][2] = 2462 b[1][434][1] = 2463 b[1][434][0] = 2464 
c    b[1][435][2] = 2465 b[1][435][1] = 2466 b[1][435][0] = 2467 
c    b[1][436][2] = 2468 b[1][436][1] = 2469 b[1][436][0] = 2470 
c    b[1][437][2] = 2471 b[1][437][1] = 2472 b[1][437][0] = 2473 
c    b[1][438][2] = 2474 b[1][438][1] = 2475 b[1][438][0] = 2476 
c    b[1][439][2] = 2477 b[1][439][1] = 2478 b[1][439][0] = 2479 
c    b[1][440][2] = 2480 b[1][440][1] = 2481 b[1][440][0] = 2482 
c    b[1][441][2] = 2483 b[1][441][1] = 2484 b[1][441][0] = 2485 
c    b[1][442][2] = 2486 b[1][442][1] = 2487 b[1][442][0] = 2488 
c    b[1][443][2] = 2489 b[1][443][1] = 2490 b[1][443][0] = 2491 
c    b[1][444][2] = 2492 b[1][444][1] = 2493 b[1][444][0] = 2494 
c    b[1][445][2] = 2495 b[1][445][1] = 2496 b[1][445][0] = 2497 
c    b[1][446][2] = 2498 b[1][446][1] = 2499 b[1][446][0] = 2500 
c    b[1][447][2] = 2501 b[1][447][1] = 2502 b[1][447][0] = 2503 
c    b[1][448][2] = 2504 b[1][448][1] = 2505 b[1][448][0] = 2506 
c    b[1][449][2] = 2507 b[1][449][1] = 2508 b[1][449][0] = 2509 
c    b[1][450][2] = 2510 b[1][450][1] = 2511 b[1][450][0] = 2512 
c    b[1][451][2] = 2513 b[1][451][1] = 2514 b[1][451][0] = 2515 
c    b[1][452][2] = 2516 b[1][452][1] = 2517 b[1][452][0] = 2518 
c    b[1][453][2] = 2519 b[1][453][1] = 2520 b[1][453][0] = 2521 
c    b[1][454][2] = 2522 b[1][454][1] = 2523 b[1][454][0] = 2524 
c    b[1][455][2] = 2525 b[1][455][1] = 2526 b[1][455][0] = 2527 
c    b[1][456][2] = 2528 b[1][456][1] = 2529 b[1][456][0] = 2530 
c    b[1][457][2] = 2531 b[1][457][1] = 2532 b[1][457][0] = 2533 
c    b[1][458][2] = 2534 b[1][458][1] = 2535 b[1][458][0] = 2536 
c    b[1][459][2] = 2537 b[1][459][1] = 2538 b[1][459][0] = 2539 
c    b[1][460][2] = 2540 b[1][460][1] = 2541 b[1][460][0] = 2542 
c    b[1][461][2] = 2543 b[1][461][1] = 2544 b[1][461][0] = 2545 
c    b[1][462][2] = 2546 b[1][462][1] = 2547 b[1][462][0] = 2548 
c    b[1][463][2] = 2549 b[1][463][1] = 2550 b[1][463][0] = 2551 
c    b[1][464][2] = 2552 b[1][464][1] = 2553 b[1][464][0] = 2554 
c    b[1][465][2] = 2555 b[1][465][1] = 2556 b[1][465][0] = 2557 
c    b[1][466][2] = 2558 b[1][466][1] = 2559 b[1][466][0] = 2560 
c    b[1][467][2] = 2561 b[1][467][1] = 2562 b[1][467][0] = 2563 
c    b[1][468][2] = 2564 b[1][468][1] = 2565 b[1][468][0] = 2566 
c    b[1][469][2] = 2567 b[1][469][1] = 2568 b[1][469][0] = 2569 
c    b[1][470][2] = 2570 b[1][470][1] = 2571 b[1][470][0] = 2572 
c    b[1][471][2] = 2573 b[1][471][1] = 2574 b[1][471][0] = 2575 
c    b[1][472][2] = 2576 b[1][472][1] = 2577 b[1][472][0] = 2578 
c    b[1][473][2] = 2579 b[1][473][1] = 2580 b[1][473][0] = 2581 
c    b[1][474][2] = 2582 b[1][474][1] = 2583 b[1][474][0] = 2584 
c    b[1][475][2] = 2585 b[1][475][1] = 2586 b[1][475][0] = 2587 
c    b[1][476][2] = 2588 b[1][476][1] = 2589 b[1][476][0] = 2590 
c    b[1][477][2] = 2591 b[1][477][1] = 2592 b[1][477][0] = 2593 
c    b[1][478][2] = 2594 b[1][478][1] = 2595 b[1][478][0] = 2596 
c    b[1][479][2] = 2597 b[1][479][1] = 2598 b[1][479][0] = 2599 
c    b[1][480][2] = 2600 b[1][480][1] = 2601 b[1][480][0] = 2602 
c    b[1][481][2] = 2603 b[1][481][1] = 2604 b[1][481][0] = 2605 
c    b[1][482][2] = 2606 b[1][482][1] = 2607 b[1][482][0] = 2608 
c    b[1][483][2] = 2609 b[1][483][1] = 2610 b[1][483][0] = 2611 
c    b[1][484][2] = 2612 b[1][484][1] = 2613 b[1][484][0] = 2614 
c    b[1][485][2] = 2615 b[1][485][1] = 2616 b[1][485][0] = 2617 
c    b[1][486][2] = 2618 b[1][486][1] = 2619 b[1][486][0] = 2620 
c    b[1][487][2] = 2621 b[1][487][1] = 2622 b[1][487][0] = 2623 
c    b[1][488][2] = 2624 b[1][488][1] = 2625 b[1][488][0] = 2626 
c    b[1][489][2] = 2627 b[1][489][1] = 2628 b[1][489][0] = 2629 
c    b[1][490][2] = 2630 b[1][490][1] = 2631 b[1][490][0] = 2632 
c    b[1][491][2] = 2633 b[1][491][1] = 2634 b[1][491][0] = 2635 
c    b[1][492][2] = 2636 b[1][492][1] = 2637 b[1][492][0] = 2638 
c    b[1][493][2] = 2639 b[1][493][1] = 2640 b[1][493][0] = 2641 
c    b[1][494][2] = 2642 b[1][494][1] = 2643 b[1][494][0] = 2644 
c    b[1][495][2] = 2645 b[1][495][1] = 2646 b[1][495][0] = 2647 
c    b[1][496][2] = 2648 b[1][496][1] = 2649 b[1][496][0] = 2650 
c    b[1][497][2] = 2651 b[1][497][1] = 2652 b[1][497][0] = 2653 
c    b[1][498][2] = 2654 b[1][498][1] = 2655 b[1][498][0] = 2656 
c    b[1][499][2] = 2657 b[1][499][1] = 2658 b[1][499][0] = 2659 
c    b[1][500][2] = 2660 b[1][500][1] = 2661 b[1][500][0] = 2662 
c    b[1][501][2] = 2663 b[1][501][1] = 2664 b[1][501][0] = 2665 
c    b[1][502][2] = 2666 b[1][502][1] = 2667 b[1][502][0] = 2668 
c    b[1][503][2] = 2669 b[1][503][1] = 2670 b[1][503][0] = 2671 
c    b[1][504][2] = 2672 b[1][504][1] = 2673 b[1][504][0] = 2674 
c    b[1][505][2] = 2675 b[1][505][1] = 2676 b[1][505][0] = 2677 
c    b[1][506][2] = 2678 b[1][506][1] = 2679 b[1][506][0] = 2680 
c    b[1][507][2] = 2681 b[1][507][1] = 2682 b[1][507][0] = 2683 
c    b[1][508][2] = 2684 b[1][508][1] = 2685 b[1][508][0] = 2686 
c    b[1][509][2] = 2687 b[1][509][1] = 2688 b[1][509][0] = 2689 
c    b[1][510][2] = 2690 b[1][510][1] = 2691 b[1][510][0] = 2692 
c    b[1][511][2] = 2693 b[1][511][1] = 2694 b[1][511][0] = 2695 
c    b[1][512][2] = 2696 b[1][512][1] = 2697 b[1][512][0] = 2698 
c    b[1][513][2] = 2699 b[1][513][1] = 2700 b[1][513][0] = 2701 
c    b[1][514][2] = 2702 b[1][514][1] = 2703 b[1][514][0] = 2704 
c    b[1][515][2] = 2705 b[1][515][1] = 2706 b[1][515][0] = 2707 
c    b[1][516][2] = 2708 b[1][516][1] = 2709 b[1][516][0] = 2710 
c    b[1][517][2] = 2711 b[1][517][1] = 2712 b[1][517][0] = 2713 
c    b[1][518][2] = 2714 b[1][518][1] = 2715 b[1][518][0] = 2716 
c    b[1][519][2] = 2717 b[1][519][1] = 2718 b[1][519][0] = 2719 
c    b[1][520][2] = 2720 b[1][520][1] = 2721 b[1][520][0] = 2722 
c    b[1][521][2] = 2723 b[1][521][1] = 2724 b[1][521][0] = 2725 
c    b[1][522][2] = 2726 b[1][522][1] = 2727 b[1][522][0] = 2728 
c    b[1][523][2] = 2729 b[1][523][1] = 2730 b[1][523][0] = 2731 
c    b[1][524][2] = 2732 b[1][524][1] = 2733 b[1][524][0] = 2734 
c    b[1][525][2] = 2735 b[1][525][1] = 2736 b[1][525][0] = 2737 
c    b[1][526][2] = 2738 b[1][526][1] = 2739 b[1][526][0] = 2740 
c    b[1][527][2] = 2741 b[1][527][1] = 2742 b[1][527][0] = 2743 
c    b[1][528][2] = 2744 b[1][528][1] = 2745 b[1][528][0] = 2746 
c    b[1][529][2] = 2747 b[1][529][1] = 2748 b[1][529][0] = 2749 
c    b[1][530][2] = 2750 b[1][530][1] = 2751 b[1][530][0] = 2752 
c    b[1][531][2] = 2753 b[1][531][1] = 2754 b[1][531][0] = 2755 
c    b[1][532][2] = 2756 b[1][532][1] = 2757 b[1][532][0] = 2758 
c    b[1][533][2] = 2759 b[1][533][1] = 2760 b[1][533][0] = 2761 
c    b[1][534][2] = 2762 b[1][534][1] = 2763 b[1][534][0] = 2764 
c    b[1][535][2] = 2765 b[1][535][1] = 2766 b[1][535][0] = 2767 
c    b[1][536][2] = 2768 b[1][536][1] = 2769 b[1][536][0] = 2770 
c    b[1][537][2] = 2771 b[1][537][1] = 2772 b[1][537][0] = 2773 
c    b[1][538][2] = 2774 b[1][538][1] = 2775 b[1][538][0] = 2776 
c    b[1][539][2] = 2777 b[1][539][1] = 2778 b[1][539][0] = 2779 
c    b[1][540][2] = 2780 b[1][540][1] = 2781 b[1][540][0] = 2782 
c    b[1][541][2] = 2783 b[1][541][1] = 2784 b[1][541][0] = 2785 
c    b[1][542][2] = 2786 b[1][542][1] = 2787 b[1][542][0] = 2788 
c    b[1][543][2] = 2789 b[1][543][1] = 2790 b[1][543][0] = 2791 
c    b[1][544][2] = 2792 b[1][544][1] = 2793 b[1][544][0] = 2794 
c    b[1][545][2] = 2795 b[1][545][1] = 2796 b[1][545][0] = 2797 
c    b[1][546][2] = 2798 b[1][546][1] = 2799 b[1][546][0] = 2800 
c    b[1][547][2] = 2801 b[1][547][1] = 2802 b[1][547][0] = 2803 
c    b[1][548][2] = 2804 b[1][548][1] = 2805 b[1][548][0] = 2806 
c    b[1][549][2] = 2807 b[1][549][1] = 2808 b[1][549][0] = 2809 
c    b[1][550][2] = 2810 b[1][550][1] = 2811 b[1][550][0] = 2812 
c    b[1][551][2] = 2813 b[1][551][1] = 2814 b[1][551][0] = 2815 
c    b[1][552][2] = 2816 b[1][552][1] = 2817 b[1][552][0] = 2818 
c    b[1][553][2] = 2819 b[1][553][1] = 2820 b[1][553][0] = 2821 
c    b[1][554][2] = 2822 b[1][554][1] = 2823 b[1][554][0] = 2824 
c    b[1][555][2] = 2825 b[1][555][1] = 2826 b[1][555][0] = 2827 
c    b[1][556][2] = 2828 b[1][556][1] = 2829 b[1][556][0] = 2830 
c    b[1][557][2] = 2831 b[1][557][1] = 2832 b[1][557][0] = 2833 
c    b[1][558][2] = 2834 b[1][558][1] = 2835 b[1][558][0] = 2836 
c    b[1][559][2] = 2837 b[1][559][1] = 2838 b[1][559][0] = 2839 
c    b[1][560][2] = 2840 b[1][560][1] = 2841 b[1][560][0] = 2842 
c    b[1][561][2] = 2843 b[1][561][1] = 2844 b[1][561][0] = 2845 
c    b[1][562][2] = 2846 b[1][562][1] = 2847 b[1][562][0] = 2848 
c    b[1][563][2] = 2849 b[1][563][1] = 2850 b[1][563][0] = 2851 
c    b[1][564][2] = 2852 b[1][564][1] = 2853 b[1][564][0] = 2854 
c    b[1][565][2] = 2855 b[1][565][1] = 2856 b[1][565][0] = 2857 
c    b[1][566][2] = 2858 b[1][566][1] = 2859 b[1][566][0] = 2860 
c    b[1][567][2] = 2861 b[1][567][1] = 2862 b[1][567][0] = 2863 
c    b[1][568][2] = 2864 b[1][568][1] = 2865 b[1][568][0] = 2866 
c    b[1][569][2] = 2867 b[1][569][1] = 2868 b[1][569][0] = 2869 
c    b[1][570][2] = 2870 b[1][570][1] = 2871 b[1][570][0] = 2872 
c    b[1][571][2] = 2873 b[1][571][1] = 2874 b[1][571][0] = 2875 
c    b[1][572][2] = 2876 b[1][572][1] = 2877 b[1][572][0] = 2878 
c    b[1][573][2] = 2879 b[1][573][1] = 2880 b[1][573][0] = 2881 
c    b[1][574][2] = 2882 b[1][574][1] = 2883 b[1][574][0] = 2884 
c    b[1][575][2] = 2885 b[1][575][1] = 2886 b[1][575][0] = 2887 
c    b[1][576][2] = 2888 b[1][576][1] = 2889 b[1][576][0] = 2890 
c    b[1][577][2] = 2891 b[1][577][1] = 2892 b[1][577][0] = 2893 
c    b[1][578][2] = 2894 b[1][578][1] = 2895 b[1][578][0] = 2896 
c    b[1][579][2] = 2897 b[1][579][1] = 2898 b[1][579][0] = 2899 
c    b[1][580][2] = 2900 b[1][580][1] = 2901 b[1][580][0] = 2902 
c    b[1][581][2] = 2903 b[1][581][1] = 2904 b[1][581][0] = 2905 
c    b[1][582][2] = 2906 b[1][582][1] = 2907 b[1][582][0] = 2908 
c    b[1][583][2] = 2909 b[1][583][1] = 2910 b[1][583][0] = 2911 
c    b[1][584][2] = 2912 b[1][584][1] = 2913 b[1][584][0] = 2914 
c    b[1][585][2] = 2915 b[1][585][1] = 2916 b[1][585][0] = 2917 
c    b[1][586][2] = 2918 b[1][586][1] = 2919 b[1][586][0] = 2920 
c    b[1][587][2] = 2921 b[1][587][1] = 2922 b[1][587][0] = 2923 
c    b[1][588][2] = 2924 b[1][588][1] = 2925 b[1][588][0] = 2926 
c    b[1][589][2] = 2927 b[1][589][1] = 2928 b[1][589][0] = 2929 
c    b[1][590][2] = 2930 b[1][590][1] = 2931 b[1][590][0] = 2932 
c    b[1][591][2] = 2933 b[1][591][1] = 2934 b[1][591][0] = 2935 
c    b[1][592][2] = 2936 b[1][592][1] = 2937 b[1][592][0] = 2938 
c    b[1][593][2] = 2939 b[1][593][1] = 2940 b[1][593][0] = 2941 
c    b[1][594][2] = 2942 b[1][594][1] = 2943 b[1][594][0] = 2944 
c    b[1][595][2] = 2945 b[1][595][1] = 2946 b[1][595][0] = 2947 
c    b[1][596][2] = 2948 b[1][596][1] = 2949 b[1][596][0] = 2950 
c    b[1][597][2] = 2951 b[1][597][1] = 2952 b[1][597][0] = 2953 
c    b[1][598][2] = 2954 b[1][598][1] = 2955 b[1][598][0] = 2956 
c    b[1][599][2] = 2957 b[1][599][1] = 2958 b[1][599][0] = 2959 
c    b[1][600][2] = 2960 b[1][600][1] = 2961 b[1][600][0] = 2962 
c    b[1][601][2] = 2963 b[1][601][1] = 2964 b[1][601][0] = 2965 
c    b[1][602][2] = 2966 b[1][602][1] = 2967 b[1][602][0] = 2968 
c    b[1][603][2] = 2969 b[1][603][1] = 2970 b[1][603][0] = 2971 
c    b[1][604][2] = 2972 b[1][604][1] = 2973 b[1][604][0] = 2974 
c    b[1][605][2] = 2975 b[1][605][1] = 2976 b[1][605][0] = 2977 
c    b[1][606][2] = 2978 b[1][606][1] = 2979 b[1][606][0] = 2980 
c    b[1][607][2] = 2981 b[1][607][1] = 2982 b[1][607][0] = 2983 
c    b[1][608][2] = 2984 b[1][608][1] = 2985 b[1][608][0] = 2986 
c    b[1][609][2] = 2987 b[1][609][1] = 2988 b[1][609][0] = 2989 
c    b[1][610][2] = 2990 b[1][610][1] = 2991 b[1][610][0] = 2992 
c    b[1][611][2] = 2993 b[1][611][1] = 2994 b[1][611][0] = 2995 
c    b[1][612][2] = 2996 b[1][612][1] = 2997 b[1][612][0] = 2998 
c    b[1][613][2] = 2999 b[1][613][1] = 3000 b[1][613][0] = 3001 
c    b[1][614][2] = 3002 b[1][614][1] = 3003 b[1][614][0] = 3004 
c    b[1][615][2] = 3005 b[1][615][1] = 3006 b[1][615][0] = 3007 
c    b[1][616][2] = 3008 b[1][616][1] = 3009 b[1][616][0] = 3010 
c    b[1][617][2] = 3011 b[1][617][1] = 3012 b[1][617][0] = 3013 
c    b[1][618][2] = 3014 b[1][618][1] = 3015 b[1][618][0] = 3016 
c    b[1][619][2] = 3017 b[1][619][1] = 3018 b[1][619][0] = 3019 
c    b[1][620][2] = 3020 b[1][620][1] = 3021 b[1][620][0] = 3022 
c    b[1][621][2] = 3023 b[1][621][1] = 3024 b[1][621][0] = 3025 
c    b[1][622][2] = 3026 b[1][622][1] = 3027 b[1][622][0] = 3028 
c    b[1][623][2] = 3029 b[1][623][1] = 3030 b[1][623][0] = 3031 
c    b[1][624][2] = 3032 b[1][624][1] = 3033 b[1][624][0] = 3034 
c    b[1][625][2] = 3035 b[1][625][1] = 3036 b[1][625][0] = 3037 
c    b[1][626][2] = 3038 b[1][626][1] = 3039 b[1][626][0] = 3040 
c    b[1][627][2] = 3041 b[1][627][1] = 3042 b[1][627][0] = 3043 
c    b[1][628][2] = 3044 b[1][628][1] = 3045 b[1][628][0] = 3046 
c    b[1][629][2] = 3047 b[1][629][1] = 3048 b[1][629][0] = 3049 
c    b[1][630][2] = 3050 b[1][630][1] = 3051 b[1][630][0] = 3052 
c    b[1][631][2] = 3053 b[1][631][1] = 3054 b[1][631][0] = 3055 
c    b[1][632][2] = 3056 b[1][632][1] = 3057 b[1][632][0] = 3058 
c    b[1][633][2] = 3059 b[1][633][1] = 3060 b[1][633][0] = 3061 
c    b[1][634][2] = 3062 b[1][634][1] = 3063 b[1][634][0] = 3064 
c    b[1][635][2] = 3065 b[1][635][1] = 3066 b[1][635][0] = 3067 
c    b[1][636][2] = 3068 b[1][636][1] = 3069 b[1][636][0] = 3070 
c    b[1][637][2] = 3071 b[1][637][1] = 3072 b[1][637][0] = 3073 
c    b[1][638][2] = 3074 b[1][638][1] = 3075 b[1][638][0] = 3076 
c    b[1][639][2] = 3077 b[1][639][1] = 3078 b[1][639][0] = 3079 
c    b[1][640][2] = 3080 b[1][640][1] = 3081 b[1][640][0] = 3082 
c    b[1][641][2] = 3083 b[1][641][1] = 3084 b[1][641][0] = 3085 
c    b[1][642][2] = 3086 b[1][642][1] = 3087 b[1][642][0] = 3088 
c    b[1][643][2] = 3089 b[1][643][1] = 3090 b[1][643][0] = 3091 
c    b[1][644][2] = 3092 b[1][644][1] = 3093 b[1][644][0] = 3094 
c    b[1][645][2] = 3095 b[1][645][1] = 3096 b[1][645][0] = 3097 
c    b[1][646][2] = 3098 b[1][646][1] = 3099 b[1][646][0] = 3100 
c    b[1][647][2] = 3101 b[1][647][1] = 3102 b[1][647][0] = 3103 
c    b[1][648][2] = 3104 b[1][648][1] = 3105 b[1][648][0] = 3106 
c    b[1][649][2] = 3107 b[1][649][1] = 3108 b[1][649][0] = 3109 
c    b[1][650][2] = 3110 b[1][650][1] = 3111 b[1][650][0] = 3112 
c    b[1][651][2] = 3113 b[1][651][1] = 3114 b[1][651][0] = 3115 
c    b[1][652][2] = 3116 b[1][652][1] = 3117 b[1][652][0] = 3118 
c    b[1][653][2] = 3119 b[1][653][1] = 3120 b[1][653][0] = 3121 
c    b[1][654][2] = 3122 b[1][654][1] = 3123 b[1][654][0] = 3124 
c    b[1][655][2] = 3125 b[1][655][1] = 3126 b[1][655][0] = 3127 
c    b[1][656][2] = 3128 b[1][656][1] = 3129 b[1][656][0] = 3130 
c    b[1][657][2] = 3131 b[1][657][1] = 3132 b[1][657][0] = 3133 
c    b[1][658][2] = 3134 b[1][658][1] = 3135 b[1][658][0] = 3136 
c    b[1][659][2] = 3137 b[1][659][1] = 3138 b[1][659][0] = 3139 
c    b[1][660][2] = 3140 b[1][660][1] = 3141 b[1][660][0] = 3142 
c    b[1][661][2] = 3143 b[1][661][1] = 3144 b[1][661][0] = 3145 
c    b[1][662][2] = 3146 b[1][662][1] = 3147 b[1][662][0] = 3148 
c    b[1][663][2] = 3149 b[1][663][1] = 3150 b[1][663][0] = 3151 
c    b[1][664][2] = 3152 b[1][664][1] = 3153 b[1][664][0] = 3154 
c    b[1][665][2] = 3155 b[1][665][1] = 3156 b[1][665][0] = 3157 
c    b[1][666][2] = 3158 b[1][666][1] = 3159 b[1][666][0] = 3160 
c    b[1][667][2] = 3161 b[1][667][1] = 3162 b[1][667][0] = 3163 
c    b[1][668][2] = 3164 b[1][668][1] = 3165 b[1][668][0] = 3166 
c    b[1][669][2] = 3167 b[1][669][1] = 3168 b[1][669][0] = 3169 
c    b[1][670][2] = 3170 b[1][670][1] = 3171 b[1][670][0] = 3172 
c    b[1][671][2] = 3173 b[1][671][1] = 3174 b[1][671][0] = 3175 
c    b[1][672][2] = 3176 b[1][672][1] = 3177 b[1][672][0] = 3178 
c    b[1][673][2] = 3179 b[1][673][1] = 3180 b[1][673][0] = 3181 
c    b[1][674][2] = 3182 b[1][674][1] = 3183 b[1][674][0] = 3184 
c    b[1][675][2] = 3185 b[1][675][1] = 3186 b[1][675][0] = 3187 
c    b[1][676][2] = 3188 b[1][676][1] = 3189 b[1][676][0] = 3190 
c    b[1][677][2] = 3191 b[1][677][1] = 3192 b[1][677][0] = 3193 
c    b[1][678][2] = 3194 b[1][678][1] = 3195 b[1][678][0] = 3196 
c    b[1][679][2] = 3197 b[1][679][1] = 3198 b[1][679][0] = 3199 
c    b[1][680][2] = 3200 b[1][680][1] = 3201 b[1][680][0] = 3202 
c    b[1][681][2] = 3203 b[1][681][1] = 3204 b[1][681][0] = 3205 
c    b[1][682][2] = 3206 b[1][682][1] = 3207 b[1][682][0] = 3208 
c    b[1][683][2] = 3209 b[1][683][1] = 3210 b[1][683][0] = 3211 
c    b[1][684][2] = 3212 b[1][684][1] = 3213 b[1][684][0] = 3214 
c    b[1][685][2] = 3215 b[1][685][1] = 3216 b[1][685][0] = 3217 
c    b[1][686][2] = 3218 b[1][686][1] = 3219 b[1][686][0] = 3220 
c    b[1][687][2] = 3221 b[1][687][1] = 3222 b[1][687][0] = 3223 
c    b[1][688][2] = 3224 b[1][688][1] = 3225 b[1][688][0] = 3226 
c    b[1][689][2] = 3227 b[1][689][1] = 3228 b[1][689][0] = 3229 
c    b[1][690][2] = 3230 b[1][690][1] = 3231 b[1][690][0] = 3232 
c    b[1][691][2] = 3233 b[1][691][1] = 3234 b[1][691][0] = 3235 
c    b[1][692][2] = 3236 b[1][692][1] = 3237 b[1][692][0] = 3238 
c    b[1][693][2] = 3239 b[1][693][1] = 3240 b[1][693][0] = 3241 
c    b[1][694][2] = 3242 b[1][694][1] = 3243 b[1][694][0] = 3244 
c    b[1][695][2] = 3245 b[1][695][1] = 3246 b[1][695][0] = 3247 
c    b[1][696][2] = 3248 b[1][696][1] = 3249 b[1][696][0] = 3250 
c    b[1][697][2] = 3251 b[1][697][1] = 3252 b[1][697][0] = 3253 
c    b[1][698][2] = 3254 b[1][698][1] = 3255 b[1][698][0] = 3256 
c    b[1][699][2] = 3257 b[1][699][1] = 3258 b[1][699][0] = 3259 
c    b[1][700][2] = 3260 b[1][700][1] = 3261 b[1][700][0] = 3262 
c    b[1][701][2] = 3263 b[1][701][1] = 3264 b[1][701][0] = 3265 
c    b[1][702][2] = 3266 b[1][702][1] = 3267 b[1][702][0] = 3268 
c    b[1][703][2] = 3269 b[1][703][1] = 3270 b[1][703][0] = 3271 
c    b[1][704][2] = 3272 b[1][704][1] = 3273 b[1][704][0] = 3274 
c    b[1][705][2] = 3275 b[1][705][1] = 3276 b[1][705][0] = 3277 
c    b[1][706][2] = 3278 b[1][706][1] = 3279 b[1][706][0] = 3280 
c    b[1][707][2] = 3281 b[1][707][1] = 3282 b[1][707][0] = 3283 
c    b[1][708][2] = 3284 b[1][708][1] = 3285 b[1][708][0] = 3286 
c    b[1][709][2] = 3287 b[1][709][1] = 3288 b[1][709][0] = 3289 
c    b[1][710][2] = 3290 b[1][710][1] = 3291 b[1][710][0] = 3292 
c    b[1][711][2] = 3293 b[1][711][1] = 3294 b[1][711][0] = 3295 
c    b[1][712][2] = 3296 b[1][712][1] = 3297 b[1][712][0] = 3298 
c    b[1][713][2] = 3299 b[1][713][1] = 3300 b[1][713][0] = 3301 
c    b[1][714][2] = 3302 b[1][714][1] = 3303 b[1][714][0] = 3304 
c    b[1][715][2] = 3305 b[1][715][1] = 3306 b[1][715][0] = 3307 
c    b[1][716][2] = 3308 b[1][716][1] = 3309 b[1][716][0] = 3310 
c    b[1][717][2] = 3311 b[1][717][1] = 3312 b[1][717][0] = 3313 
c    b[1][718][2] = 3314 b[1][718][1] = 3315 b[1][718][0] = 3316 
c    b[1][719][2] = 3317 b[1][719][1] = 3318 b[1][719][0] = 3319 
c    b[1][720][2] = 3320 b[1][720][1] = 3321 b[1][720][0] = 3322 
c    b[1][721][2] = 3323 b[1][721][1] = 3324 b[1][721][0] = 3325 
c    b[1][722][2] = 3326 b[1][722][1] = 3327 b[1][722][0] = 3328 
c    b[1][723][2] = 3329 b[1][723][1] = 3330 b[1][723][0] = 3331 
c    b[1][724][2] = 3332 b[1][724][1] = 3333 b[1][724][0] = 3334 
c    b[1][725][2] = 3335 b[1][725][1] = 3336 b[1][725][0] = 3337 
c    b[1][726][2] = 3338 b[1][726][1] = 3339 b[1][726][0] = 3340 
c    b[1][727][2] = 3341 b[1][727][1] = 3342 b[1][727][0] = 3343 
c    b[1][728][2] = 3344 b[1][728][1] = 3345 b[1][728][0] = 3346 
c    b[1][729][2] = 3347 b[1][729][1] = 3348 b[1][729][0] = 3349 
c    b[1][730][2] = 3350 b[1][730][1] = 3351 b[1][730][0] = 3352 
c    b[1][731][2] = 3353 b[1][731][1] = 3354 b[1][731][0] = 3355 
c    b[1][732][2] = 3356 b[1][732][1] = 3357 b[1][732][0] = 3358 
c    b[1][733][2] = 3359 b[1][733][1] = 3360 b[1][733][0] = 3361 
c    b[1][734][2] = 3362 b[1][734][1] = 3363 b[1][734][0] = 3364 
c    b[1][735][2] = 3365 b[1][735][1] = 3366 b[1][735][0] = 3367 
c    b[1][736][2] = 3368 b[1][736][1] = 3369 b[1][736][0] = 3370 
c    b[1][737][2] = 3371 b[1][737][1] = 3372 b[1][737][0] = 3373 
c    b[1][738][2] = 3374 b[1][738][1] = 3375 b[1][738][0] = 3376 
c    b[1][739][2] = 3377 b[1][739][1] = 3378 b[1][739][0] = 3379 
c    b[1][740][2] = 3380 b[1][740][1] = 3381 b[1][740][0] = 3382 
c    b[1][741][2] = 3383 b[1][741][1] = 3384 b[1][741][0] = 3385 
c    b[1][742][2] = 3386 b[1][742][1] = 3387 b[1][742][0] = 3388 
c    b[1][743][2] = 3389 b[1][743][1] = 3390 b[1][743][0] = 3391 
c    b[1][744][2] = 3392 b[1][744][1] = 3393 b[1][744][0] = 3394 
c    b[1][745][2] = 3395 b[1][745][1] = 3396 b[1][745][0] = 3397 
c    b[1][746][2] = 3398 b[1][746][1] = 3399 b[1][746][0] = 3400 
c    b[1][747][2] = 3401 b[1][747][1] = 3402 b[1][747][0] = 3403 
c    b[1][748][2] = 3404 b[1][748][1] = 3405 b[1][748][0] = 3406 
c    b[1][749][2] = 3407 b[1][749][1] = 3408 b[1][749][0] = 3409 
c    b[1][750][2] = 3410 b[1][750][1] = 3411 b[1][750][0] = 3412 
c    b[1][751][2] = 3413 b[1][751][1] = 3414 b[1][751][0] = 3415 
c    b[1][752][2] = 3416 b[1][752][1] = 3417 b[1][752][0] = 3418 
c    b[1][753][2] = 3419 b[1][753][1] = 3420 b[1][753][0] = 3421 
c    b[1][754][2] = 3422 b[1][754][1] = 3423 b[1][754][0] = 3424 
c    b[1][755][2] = 3425 b[1][755][1] = 3426 b[1][755][0] = 3427 
c    b[1][756][2] = 3428 b[1][756][1] = 3429 b[1][756][0] = 3430 
c    b[1][757][2] = 3431 b[1][757][1] = 3432 b[1][757][0] = 3433 
c    b[1][758][2] = 3434 b[1][758][1] = 3435 b[1][758][0] = 3436 
c    b[1][759][2] = 3437 b[1][759][1] = 3438 b[1][759][0] = 3439 
c    b[1][760][2] = 3440 b[1][760][1] = 3441 b[1][760][0] = 3442 
c    b[1][761][2] = 3443 b[1][761][1] = 3444 b[1][761][0] = 3445 
c    b[1][762][2] = 3446 b[1][762][1] = 3447 b[1][762][0] = 3448 
c    b[1][763][2] = 3449 b[1][763][1] = 3450 b[1][763][0] = 3451 
c    b[1][764][2] = 3452 b[1][764][1] = 3453 b[1][764][0] = 3454 
c    b[1][765][2] = 3455 b[1][765][1] = 3456 b[1][765][0] = 3457 
c    b[1][766][2] = 3458 b[1][766][1] = 3459 b[1][766][0] = 3460 
c    b[1][767][2] = 3461 b[1][767][1] = 3462 b[1][767][0] = 3463 
c    b[1][768][2] = 3464 b[1][768][1] = 3465 b[1][768][0] = 3466 
c    b[1][769][2] = 3467 b[1][769][1] = 3468 b[1][769][0] = 3469 
c    b[1][770][2] = 3470 b[1][770][1] = 3471 b[1][770][0] = 3472 
c    b[1][771][2] = 3473 b[1][771][1] = 3474 b[1][771][0] = 3475 
c    b[1][772][2] = 3476 b[1][772][1] = 3477 b[1][772][0] = 3478 
c    b[1][773][2] = 3479 b[1][773][1] = 3480 b[1][773][0] = 3481 
c    b[1][774][2] = 3482 b[1][774][1] = 3483 b[1][774][0] = 3484 
c    b[1][775][2] = 3485 b[1][775][1] = 3486 b[1][775][0] = 3487 
c    b[1][776][2] = 3488 b[1][776][1] = 3489 b[1][776][0] = 3490 
c    b[1][777][2] = 3491 b[1][777][1] = 3492 b[1][777][0] = 3493 
c    b[1][778][2] = 3494 b[1][778][1] = 3495 b[1][778][0] = 3496 
c    b[1][779][2] = 3497 b[1][779][1] = 3498 b[1][779][0] = 3499 
c    b[1][780][2] = 3500 b[1][780][1] = 3501 b[1][780][0] = 3502 
c    b[1][781][2] = 3503 b[1][781][1] = 3504 b[1][781][0] = 3505 
c    b[1][782][2] = 3506 b[1][782][1] = 3507 b[1][782][0] = 3508 
c    b[1][783][2] = 3509 b[1][783][1] = 3510 b[1][783][0] = 3511 
c    b[1][784][2] = 3512 b[1][784][1] = 3513 b[1][784][0] = 3514 
c    b[1][785][2] = 3515 b[1][785][1] = 3516 b[1][785][0] = 3517 
c    b[1][786][2] = 3518 b[1][786][1] = 3519 b[1][786][0] = 3520 
c    b[1][787][2] = 3521 b[1][787][1] = 3522 b[1][787][0] = 3523 
c    b[1][788][2] = 3524 b[1][788][1] = 3525 b[1][788][0] = 3526 
c    b[1][789][2] = 3527 b[1][789][1] = 3528 b[1][789][0] = 3529 
c    b[1][790][2] = 3530 b[1][790][1] = 3531 b[1][790][0] = 3532 
c    b[1][791][2] = 3533 b[1][791][1] = 3534 b[1][791][0] = 3535 
c    b[1][792][2] = 3536 b[1][792][1] = 3537 b[1][792][0] = 3538 
c    b[1][793][2] = 3539 b[1][793][1] = 3540 b[1][793][0] = 3541 
c    b[1][794][2] = 3542 b[1][794][1] = 3543 b[1][794][0] = 3544 
c    b[1][795][2] = 3545 b[1][795][1] = 3546 b[1][795][0] = 3547 
c    b[1][796][2] = 3548 b[1][796][1] = 3549 b[1][796][0] = 3550 
c    b[1][797][2] = 3551 b[1][797][1] = 3552 b[1][797][0] = 3553 
c    b[1][798][2] = 3554 b[1][798][1] = 3555 b[1][798][0] = 3556 
c    b[1][799][2] = 3557 b[1][799][1] = 3558 b[1][799][0] = 3559 
c    b[1][800][2] = 3560 b[1][800][1] = 3561 b[1][800][0] = 3562 
c    b[1][801][2] = 3563 b[1][801][1] = 3564 b[1][801][0] = 3565 
c    b[1][802][2] = 3566 b[1][802][1] = 3567 b[1][802][0] = 3568 
c    b[1][803][2] = 3569 b[1][803][1] = 3570 b[1][803][0] = 3571 
c    b[1][804][2] = 3572 b[1][804][1] = 3573 b[1][804][0] = 3574 
c    b[1][805][2] = 3575 b[1][805][1] = 3576 b[1][805][0] = 3577 
c    b[1][806][2] = 3578 b[1][806][1] = 3579 b[1][806][0] = 3580 
c    b[1][807][2] = 3581 b[1][807][1] = 3582 b[1][807][0] = 3583 
c    b[1][808][2] = 3584 b[1][808][1] = 3585 b[1][808][0] = 3586 
c    b[1][809][2] = 3587 b[1][809][1] = 3588 b[1][809][0] = 3589 
c    b[1][810][2] = 3590 b[1][810][1] = 3591 b[1][810][0] = 3592 
c    b[1][811][2] = 3593 b[1][811][1] = 3594 b[1][811][0] = 3595 
c    b[1][812][2] = 3596 b[1][812][1] = 3597 b[1][812][0] = 3598 
c    b[1][813][2] = 3599 b[1][813][1] = 3600 b[1][813][0] = 3601 
c    b[1][814][2] = 3602 b[1][814][1] = 3603 b[1][814][0] = 3604 
c    b[1][815][2] = 3605 b[1][815][1] = 3606 b[1][815][0] = 3607 
c    b[1][816][2] = 3608 b[1][816][1] = 3609 b[1][816][0] = 3610 
c    b[1][817][2] = 3611 b[1][817][1] = 3612 b[1][817][0] = 3613 
c    b[1][818][2] = 3614 b[1][818][1] = 3615 b[1][818][0] = 3616 
c    b[1][819][2] = 3617 b[1][819][1] = 3618 b[1][819][0] = 3619 
c    b[1][820][2] = 3620 b[1][820][1] = 3621 b[1][820][0] = 3622 
c    b[1][821][2] = 3623 b[1][821][1] = 3624 b[1][821][0] = 3625 
c    b[1][822][2] = 3626 b[1][822][1] = 3627 b[1][822][0] = 3628 
c    b[1][823][2] = 3629 b[1][823][1] = 3630 b[1][823][0] = 3631 
c    b[1][824][2] = 3632 b[1][824][1] = 3633 b[1][824][0] = 3634 
c    b[1][825][2] = 3635 b[1][825][1] = 3636 b[1][825][0] = 3637 
c    b[1][826][2] = 3638 b[1][826][1] = 3639 b[1][826][0] = 3640 
c    b[1][827][2] = 3641 b[1][827][1] = 3642 b[1][827][0] = 3643 
c    b[1][828][2] = 3644 b[1][828][1] = 3645 b[1][828][0] = 3646 
c    b[1][829][2] = 3647 b[1][829][1] = 3648 b[1][829][0] = 3649 
c    b[1][830][2] = 3650 b[1][830][1] = 3651 b[1][830][0] = 3652 
c    b[1][831][2] = 3653 b[1][831][1] = 3654 b[1][831][0] = 3655 
c    b[1][832][2] = 3656 b[1][832][1] = 3657 b[1][832][0] = 3658 
c    b[1][833][2] = 3659 b[1][833][1] = 3660 b[1][833][0] = 3661 
c    b[1][834][2] = 3662 b[1][834][1] = 3663 b[1][834][0] = 3664 
c    b[1][835][2] = 3665 b[1][835][1] = 3666 b[1][835][0] = 3667 
c    b[1][836][2] = 3668 b[1][836][1] = 3669 b[1][836][0] = 3670 
c    b[1][837][2] = 3671 b[1][837][1] = 3672 b[1][837][0] = 3673 
c    b[1][838][2] = 3674 b[1][838][1] = 3675 b[1][838][0] = 3676 
c    b[1][839][2] = 3677 b[1][839][1] = 3678 b[1][839][0] = 3679 
c    b[1][840][2] = 3680 b[1][840][1] = 3681 b[1][840][0] = 3682 
c    b[1][841][2] = 3683 b[1][841][1] = 3684 b[1][841][0] = 3685 
c    b[1][842][2] = 3686 b[1][842][1] = 3687 b[1][842][0] = 3688 
c    b[1][843][2] = 3689 b[1][843][1] = 3690 b[1][843][0] = 3691 
c    b[1][844][2] = 3692 b[1][844][1] = 3693 b[1][844][0] = 3694 
c    b[1][845][2] = 3695 b[1][845][1] = 3696 b[1][845][0] = 3697 
c    b[1][846][2] = 3698 b[1][846][1] = 3699 b[1][846][0] = 3700 
c    b[1][847][2] = 3701 b[1][847][1] = 3702 b[1][847][0] = 3703 
c    b[1][848][2] = 3704 b[1][848][1] = 3705 b[1][848][0] = 3706 
c    b[1][849][2] = 3707 b[1][849][1] = 3708 b[1][849][0] = 3709 
c    b[1][850][2] = 3710 b[1][850][1] = 3711 b[1][850][0] = 3712 
c    b[1][851][2] = 3713 b[1][851][1] = 3714 b[1][851][0] = 3715 
c    b[1][852][2] = 3716 b[1][852][1] = 3717 b[1][852][0] = 3718 
c    b[1][853][2] = 3719 b[1][853][1] = 3720 b[1][853][0] = 3721 
c    b[1][854][2] = 3722 b[1][854][1] = 3723 b[1][854][0] = 3724 
c    b[1][855][2] = 3725 b[1][855][1] = 3726 b[1][855][0] = 3727 
c    b[1][856][2] = 3728 b[1][856][1] = 3729 b[1][856][0] = 3730 
c    b[1][857][2] = 3731 b[1][857][1] = 3732 b[1][857][0] = 3733 
c    b[1][858][2] = 3734 b[1][858][1] = 3735 b[1][858][0] = 3736 
c    b[1][859][2] = 3737 b[1][859][1] = 3738 b[1][859][0] = 3739 
c    b[1][860][2] = 3740 b[1][860][1] = 3741 b[1][860][0] = 3742 
c    b[1][861][2] = 3743 b[1][861][1] = 3744 b[1][861][0] = 3745 
c    b[1][862][2] = 3746 b[1][862][1] = 3747 b[1][862][0] = 3748 
c    b[1][863][2] = 3749 b[1][863][1] = 3750 b[1][863][0] = 3751 
c    b[1][864][2] = 3752 b[1][864][1] = 3753 b[1][864][0] = 3754 
c    b[1][865][2] = 3755 b[1][865][1] = 3756 b[1][865][0] = 3757 
c    b[1][866][2] = 3758 b[1][866][1] = 3759 b[1][866][0] = 3760 
c    b[1][867][2] = 3761 b[1][867][1] = 3762 b[1][867][0] = 3763 
c    b[1][868][2] = 3764 b[1][868][1] = 3765 b[1][868][0] = 3766 
c    b[1][869][2] = 3767 b[1][869][1] = 3768 b[1][869][0] = 3769 
c    b[1][870][2] = 3770 b[1][870][1] = 3771 b[1][870][0] = 3772 
c    b[1][871][2] = 3773 b[1][871][1] = 3774 b[1][871][0] = 3775 
c    b[1][872][2] = 3776 b[1][872][1] = 3777 b[1][872][0] = 3778 
c    b[1][873][2] = 3779 b[1][873][1] = 3780 b[1][873][0] = 3781 
c    b[1][874][2] = 3782 b[1][874][1] = 3783 b[1][874][0] = 3784 
c    b[1][875][2] = 3785 b[1][875][1] = 3786 b[1][875][0] = 3787 
c    b[1][876][2] = 3788 b[1][876][1] = 3789 b[1][876][0] = 3790 
c    b[1][877][2] = 3791 b[1][877][1] = 3792 b[1][877][0] = 3793 
c    b[1][878][2] = 3794 b[1][878][1] = 3795 b[1][878][0] = 3796 
c    b[1][879][2] = 3797 b[1][879][1] = 3798 b[1][879][0] = 3799 
c    b[1][880][2] = 3800 b[1][880][1] = 3801 b[1][880][0] = 3802 
c    b[1][881][2] = 3803 b[1][881][1] = 3804 b[1][881][0] = 3805 
c    b[1][882][2] = 3806 b[1][882][1] = 3807 b[1][882][0] = 3808 
c    b[1][883][2] = 3809 b[1][883][1] = 3810 b[1][883][0] = 3811 
c    b[1][884][2] = 3812 b[1][884][1] = 3813 b[1][884][0] = 3814 
c    b[1][885][2] = 3815 b[1][885][1] = 3816 b[1][885][0] = 3817 
c    b[1][886][2] = 3818 b[1][886][1] = 3819 b[1][886][0] = 3820 
c    b[1][887][2] = 3821 b[1][887][1] = 3822 b[1][887][0] = 3823 
c    b[1][888][2] = 3824 b[1][888][1] = 3825 b[1][888][0] = 3826 
c    b[1][889][2] = 3827 b[1][889][1] = 3828 b[1][889][0] = 3829 
c    b[1][890][2] = 3830 b[1][890][1] = 3831 b[1][890][0] = 3832 
c    b[1][891][2] = 3833 b[1][891][1] = 3834 b[1][891][0] = 3835 
c    b[1][892][2] = 3836 b[1][892][1] = 3837 b[1][892][0] = 3838 
c    b[1][893][2] = 3839 b[1][893][1] = 3840 b[1][893][0] = 3841 
c    b[1][894][2] = 3842 b[1][894][1] = 3843 b[1][894][0] = 3844 
c    b[1][895][2] = 3845 b[1][895][1] = 3846 b[1][895][0] = 3847 
c    b[1][896][2] = 3848 b[1][896][1] = 3849 b[1][896][0] = 3850 
c    b[1][897][2] = 3851 b[1][897][1] = 3852 b[1][897][0] = 3853 
c    b[1][898][2] = 3854 b[1][898][1] = 3855 b[1][898][0] = 3856 
c    b[1][899][2] = 3857 b[1][899][1] = 3858 b[1][899][0] = 3859 
c    b[1][900][2] = 3860 b[1][900][1] = 3861 b[1][900][0] = 3862 
c    b[1][901][2] = 3863 b[1][901][1] = 3864 b[1][901][0] = 3865 
c    b[1][902][2] = 3866 b[1][902][1] = 3867 b[1][902][0] = 3868 
c    b[1][903][2] = 3869 b[1][903][1] = 3870 b[1][903][0] = 3871 
c    b[1][904][2] = 3872 b[1][904][1] = 3873 b[1][904][0] = 3874 
c    b[1][905][2] = 3875 b[1][905][1] = 3876 b[1][905][0] = 3877 
c    b[1][906][2] = 3878 b[1][906][1] = 3879 b[1][906][0] = 3880 
c    b[1][907][2] = 3881 b[1][907][1] = 3882 b[1][907][0] = 3883 
c    b[1][908][2] = 3884 b[1][908][1] = 3885 b[1][908][0] = 3886 
c    b[1][909][2] = 3887 b[1][909][1] = 3888 b[1][909][0] = 3889 
c    b[1][910][2] = 3890 b[1][910][1] = 3891 b[1][910][0] = 3892 
c    b[1][911][2] = 3893 b[1][911][1] = 3894 b[1][911][0] = 3895 
c    b[1][912][2] = 3896 b[1][912][1] = 3897 b[1][912][0] = 3898 
c    b[1][913][2] = 3899 b[1][913][1] = 3900 b[1][913][0] = 3901 
c    b[1][914][2] = 3902 b[1][914][1] = 3903 b[1][914][0] = 3904 
c    b[1][915][2] = 3905 b[1][915][1] = 3906 b[1][915][0] = 3907 
c    b[1][916][2] = 3908 b[1][916][1] = 3909 b[1][916][0] = 3910 
c    b[1][917][2] = 3911 b[1][917][1] = 3912 b[1][917][0] = 3913 
c    b[1][918][2] = 3914 b[1][918][1] = 3915 b[1][918][0] = 3916 
c    b[1][919][2] = 3917 b[1][919][1] = 3918 b[1][919][0] = 3919 
c    b[1][920][2] = 3920 b[1][920][1] = 3921 b[1][920][0] = 3922 
c    b[1][921][2] = 3923 b[1][921][1] = 3924 b[1][921][0] = 3925 
c    b[1][922][2] = 3926 b[1][922][1] = 3927 b[1][922][0] = 3928 
c    b[1][923][2] = 3929 b[1][923][1] = 3930 b[1][923][0] = 3931 
c    b[1][924][2] = 3932 b[1][924][1] = 3933 b[1][924][0] = 3934 
c    b[1][925][2] = 3935 b[1][925][1] = 3936 b[1][925][0] = 3937 
c    b[1][926][2] = 3938 b[1][926][1] = 3939 b[1][926][0] = 3940 
c    b[1][927][2] = 3941 b[1][927][1] = 3942 b[1][927][0] = 3943 
c    b[1][928][2] = 3944 b[1][928][1] = 3945 b[1][928][0] = 3946 
c    b[1][929][2] = 3947 b[1][929][1] = 3948 b[1][929][0] = 3949 
c    b[1][930][2] = 3950 b[1][930][1] = 3951 b[1][930][0] = 3952 
c    b[1][931][2] = 3953 b[1][931][1] = 3954 b[1][931][0] = 3955 
c    b[1][932][2] = 3956 b[1][932][1] = 3957 b[1][932][0] = 3958 
c    b[1][933][2] = 3959 b[1][933][1] = 3960 b[1][933][0] = 3961 
c    b[1][934][2] = 3962 b[1][934][1] = 3963 b[1][934][0] = 3964 
c    b[1][935][2] = 3965 b[1][935][1] = 3966 b[1][935][0] = 3967 
c    b[1][936][2] = 3968 b[1][936][1] = 3969 b[1][936][0] = 3970 
c    b[1][937][2] = 3971 b[1][937][1] = 3972 b[1][937][0] = 3973 
c    b[1][938][2] = 3974 b[1][938][1] = 3975 b[1][938][0] = 3976 
c    b[1][939][2] = 3977 b[1][939][1] = 3978 b[1][939][0] = 3979 
c    b[1][940][2] = 3980 b[1][940][1] = 3981 b[1][940][0] = 3982 
c    b[1][941][2] = 3983 b[1][941][1] = 3984 b[1][941][0] = 3985 
c    b[1][942][2] = 3986 b[1][942][1] = 3987 b[1][942][0] = 3988 
c    b[1][943][2] = 3989 b[1][943][1] = 3990 b[1][943][0] = 3991 
c    b[1][944][2] = 3992 b[1][944][1] = 3993 b[1][944][0] = 3994 
c    b[1][945][2] = 3995 b[1][945][1] = 3996 b[1][945][0] = 3997 
c    b[1][946][2] = 3998 b[1][946][1] = 3999 b[1][946][0] = 4000 
c    b[1][947][2] = 4001 b[1][947][1] = 4002 b[1][947][0] = 4003 
c    b[1][948][2] = 4004 b[1][948][1] = 4005 b[1][948][0] = 4006 
c    b[1][949][2] = 4007 b[1][949][1] = 4008 b[1][949][0] = 4009 
c    b[1][950][2] = 4010 b[1][950][1] = 4011 b[1][950][0] = 4012 
c    b[1][951][2] = 4013 b[1][951][1] = 4014 b[1][951][0] = 4015 
c    b[1][952][2] = 4016 b[1][952][1] = 4017 b[1][952][0] = 4018 
c    b[1][953][2] = 4019 b[1][953][1] = 4020 b[1][953][0] = 4021 
c    b[1][954][2] = 4022 b[1][954][1] = 4023 b[1][954][0] = 4024 
c    b[1][955][2] = 4025 b[1][955][1] = 4026 b[1][955][0] = 4027 
c    b[1][956][2] = 4028 b[1][956][1] = 4029 b[1][956][0] = 4030 
c    b[1][957][2] = 4031 b[1][957][1] = 4032 b[1][957][0] = 4033 
c    b[1][958][2] = 4034 b[1][958][1] = 4035 b[1][958][0] = 4036 
c    b[1][959][2] = 4037 b[1][959][1] = 4038 b[1][959][0] = 4039 
c    b[1][960][2] = 4040 b[1][960][1] = 4041 b[1][960][0] = 4042 
c    b[1][961][2] = 4043 b[1][961][1] = 4044 b[1][961][0] = 4045 
c    b[1][962][2] = 4046 b[1][962][1] = 4047 b[1][962][0] = 4048 
c    b[1][963][2] = 4049 b[1][963][1] = 4050 b[1][963][0] = 4051 
c    b[1][964][2] = 4052 b[1][964][1] = 4053 b[1][964][0] = 4054 
c    b[1][965][2] = 4055 b[1][965][1] = 4056 b[1][965][0] = 4057 
c    b[1][966][2] = 4058 b[1][966][1] = 4059 b[1][966][0] = 4060 
c    b[1][967][2] = 4061 b[1][967][1] = 4062 b[1][967][0] = 4063 
c    b[1][968][2] = 4064 b[1][968][1] = 4065 b[1][968][0] = 4066 
c    b[1][969][2] = 4067 b[1][969][1] = 4068 b[1][969][0] = 4069 
c    b[1][970][2] = 4070 b[1][970][1] = 4071 b[1][970][0] = 4072 
c    b[1][971][2] = 4073 b[1][971][1] = 4074 b[1][971][0] = 4075 
c    b[1][972][2] = 4076 b[1][972][1] = 4077 b[1][972][0] = 4078 
c    b[1][973][2] = 4079 b[1][973][1] = 4080 b[1][973][0] = 4081 
c    b[1][974][2] = 4082 b[1][974][1] = 4083 b[1][974][0] = 4084 
c    b[1][975][2] = 4085 b[1][975][1] = 4086 b[1][975][0] = 4087 
c    b[1][976][2] = 4088 b[1][976][1] = 4089 b[1][976][0] = 4090 
c    b[1][977][2] = 4091 b[1][977][1] = 4092 b[1][977][0] = 4093 
c    b[1][978][2] = 4094 b[1][978][1] = 4095 b[1][978][0] = 4096 
c    b[1][979][2] = 4097 b[1][979][1] = 4098 b[1][979][0] = 4099 
c    b[1][980][2] = 4100 b[1][980][1] = 4101 b[1][980][0] = 4102 
c    b[1][981][2] = 4103 b[1][981][1] = 4104 b[1][981][0] = 4105 
c    b[1][982][2] = 4106 b[1][982][1] = 4107 b[1][982][0] = 4108 
c    b[1][983][2] = 4109 b[1][983][1] = 4110 b[1][983][0] = 4111 
c    b[1][984][2] = 4112 b[1][984][1] = 4113 b[1][984][0] = 4114 
c    b[1][985][2] = 4115 b[1][985][1] = 4116 b[1][985][0] = 4117 
c    b[1][986][2] = 4118 b[1][986][1] = 4119 b[1][986][0] = 4120 
c    b[1][987][2] = 4121 b[1][987][1] = 4122 b[1][987][0] = 4123 
c    b[1][988][2] = 4124 b[1][988][1] = 4125 b[1][988][0] = 4126 
c    b[1][989][2] = 4127 b[1][989][1] = 4128 b[1][989][0] = 4129 
c    b[1][990][2] = 4130 b[1][990][1] = 4131 b[1][990][0] = 4132 
c    b[1][991][2] = 4133 b[1][991][1] = 4134 b[1][991][0] = 4135 
c    b[1][992][2] = 4136 b[1][992][1] = 4137 b[1][992][0] = 4138 
c    b[1][993][2] = 4139 b[1][993][1] = 4140 b[1][993][0] = 4141 
c    b[1][994][2] = 4142 b[1][994][1] = 4143 b[1][994][0] = 4144 
c    b[1][995][2] = 4145 b[1][995][1] = 4146 b[1][995][0] = 4147 
c    b[1][996][2] = 4148 b[1][996][1] = 4149 b[1][996][0] = 4150 
c    b[1][997][2] = 4151 b[1][997][1] = 4152 b[1][997][0] = 4153 
c    b[1][998][2] = 4154 b[1][998][1] = 4155 b[1][998][0] = 4156 
c    b[1][999][2] = 4157 b[1][999][1] = 4158 b[1][999][0] = 4159 
c    b[1][1000][2] = 4160 b[1][1000][1] = 4161 b[1][1000][0] = 4162 
c    b[1][1001][2] = 4163 b[1][1001][1] = 4164 b[1][1001][0] = 4165 
c    b[1][1002][2] = 4166 b[1][1002][1] = 4167 b[1][1002][0] = 4168 
c    b[1][1003][2] = 4169 b[1][1003][1] = 4170 b[1][1003][0] = 4171 
c    b[1][1004][2] = 4172 b[1][1004][1] = 4173 b[1][1004][0] = 4174 
c    b[1][1005][2] = 4175 b[1][1005][1] = 4176 b[1][1005][0] = 4177 
c    b[1][1006][2] = 4178 b[1][1006][1] = 4179 b[1][1006][0] = 4180 
c    b[1][1007][2] = 4181 b[1][1007][1] = 4182 b[1][1007][0] = 4183 
c    b[1][1008][2] = 4184 b[1][1008][1] = 4185 b[1][1008][0] = 4186 
c    b[1][1009][2] = 4187 b[1][1009][1] = 4188 b[1][1009][0] = 4189 
c    b[1][1010][2] = 4190 b[1][1010][1] = 4191 b[1][1010][0] = 4192 
c    b[1][1011][2] = 4193 b[1][1011][1] = 4194 b[1][1011][0] = 4195 
c    b[1][1012][2] = 4196 b[1][1012][1] = 4197 b[1][1012][0] = 4198 
c    b[1][1013][2] = 4199 b[1][1013][1] = 4200 b[1][1013][0] = 4201 
c    b[1][1014][2] = 4202 b[1][1014][1] = 4203 b[1][1014][0] = 4204 
c    b[1][1015][2] = 4205 b[1][1015][1] = 4206 b[1][1015][0] = 4207 
c    b[1][1016][2] = 4208 b[1][1016][1] = 4209 b[1][1016][0] = 4210 
c    b[1][1017][2] = 4211 b[1][1017][1] = 4212 b[1][1017][0] = 4213 
c    b[1][1018][2] = 4214 b[1][1018][1] = 4215 b[1][1018][0] = 4216 
c    b[1][1019][2] = 4217 b[1][1019][1] = 4218 b[1][1019][0] = 4219 
c    b[1][1020][2] = 4220 b[1][1020][1] = 4221 b[1][1020][0] = 4222 
c    b[1][1021][2] = 4223 b[1][1021][1] = 4224 b[1][1021][0] = 4225 
c    b[1][1022][2] = 4226 b[1][1022][1] = 4227 b[1][1022][0] = 4228 
c    b[1][1023][2] = 4229 b[1][1023][1] = 4230 b[1][1023][0] = 4231 
c    b[1][1024][2] = 4232 b[1][1024][1] = 4233 b[1][1024][0] = 4234 
c    b[1][1025][2] = 4235 b[1][1025][1] = 4236 b[1][1025][0] = 4237 
c    b[1][1026][2] = 4238 b[1][1026][1] = 4239 b[1][1026][0] = 4240 
c    b[1][1027][2] = 4241 b[1][1027][1] = 4242 b[1][1027][0] = 4243 
c    b[1][1028][2] = 4244 b[1][1028][1] = 4245 b[1][1028][0] = 4246 
c    b[1][1029][2] = 4247 b[1][1029][1] = 4248 b[1][1029][0] = 4249 
c    b[1][1030][2] = 4250 b[1][1030][1] = 4251 b[1][1030][0] = 4252 
c    b[1][1031][2] = 4253 b[1][1031][1] = 4254 b[1][1031][0] = 4255 
c    b[1][1032][2] = 4256 b[1][1032][1] = 4257 b[1][1032][0] = 4258 
c    b[1][1033][2] = 4259 b[1][1033][1] = 4260 b[1][1033][0] = 4261 
c    b[1][1034][2] = 4262 b[1][1034][1] = 4263 b[1][1034][0] = 4264 
c    b[1][1035][2] = 4265 b[1][1035][1] = 4266 b[1][1035][0] = 4267 
c    b[1][1036][2] = 4268 b[1][1036][1] = 4269 b[1][1036][0] = 4270 
c    b[1][1037][2] = 4271 b[1][1037][1] = 4272 b[1][1037][0] = 4273 
c    b[1][1038][2] = 4274 b[1][1038][1] = 4275 b[1][1038][0] = 4276 
c    b[1][1039][2] = 4277 b[1][1039][1] = 4278 b[1][1039][0] = 4279 
c    b[1][1040][2] = 4280 b[1][1040][1] = 4281 b[1][1040][0] = 4282 
c    b[1][1041][2] = 4283 b[1][1041][1] = 4284 b[1][1041][0] = 4285 
c    b[1][1042][2] = 4286 b[1][1042][1] = 4287 b[1][1042][0] = 4288 
c    b[1][1043][2] = 4289 b[1][1043][1] = 4290 b[1][1043][0] = 4291 
c    b[1][1044][2] = 4292 b[1][1044][1] = 4293 b[1][1044][0] = 4294 
c    b[1][1045][2] = 4295 b[1][1045][1] = 4296 b[1][1045][0] = 4297 
c    b[1][1046][2] = 4298 b[1][1046][1] = 4299 b[1][1046][0] = 4300 
c    b[1][1047][2] = 4301 b[1][1047][1] = 4302 b[1][1047][0] = 4303 
c    b[1][1048][2] = 4304 b[1][1048][1] = 4305 b[1][1048][0] = 4306 
c    b[1][1049][2] = 4307 b[1][1049][1] = 4308 b[1][1049][0] = 4309 
c    b[1][1050][2] = 4310 b[1][1050][1] = 4311 b[1][1050][0] = 4312 
c    b[1][1051][2] = 4313 b[1][1051][1] = 4314 b[1][1051][0] = 4315 
c    b[1][1052][2] = 4316 b[1][1052][1] = 4317 b[1][1052][0] = 4318 
c    b[1][1053][2] = 4319 b[1][1053][1] = 4320 b[1][1053][0] = 4321 
c    b[1][1054][2] = 4322 b[1][1054][1] = 4323 b[1][1054][0] = 4324 
c    b[1][1055][2] = 4325 b[1][1055][1] = 4326 b[1][1055][0] = 4327 
c    b[1][1056][2] = 4328 b[1][1056][1] = 4329 b[1][1056][0] = 4330 
c    b[1][1057][2] = 4331 b[1][1057][1] = 4332 b[1][1057][0] = 4333 
c    b[1][1058][2] = 4334 b[1][1058][1] = 4335 b[1][1058][0] = 4336 
c    b[1][1059][2] = 4337 b[1][1059][1] = 4338 b[1][1059][0] = 4339 
c    b[1][1060][2] = 4340 b[1][1060][1] = 4341 b[1][1060][0] = 4342 
c    b[1][1061][2] = 4343 b[1][1061][1] = 4344 b[1][1061][0] = 4345 
c    b[1][1062][2] = 4346 b[1][1062][1] = 4347 b[1][1062][0] = 4348 
c    b[1][1063][2] = 4349 b[1][1063][1] = 4350 b[1][1063][0] = 4351 
c    b[1][1064][2] = 4352 b[1][1064][1] = 4353 b[1][1064][0] = 4354 
c    b[1][1065][2] = 4355 b[1][1065][1] = 4356 b[1][1065][0] = 4357 
c    b[1][1066][2] = 4358 b[1][1066][1] = 4359 b[1][1066][0] = 4360 
c    b[1][1067][2] = 4361 b[1][1067][1] = 4362 b[1][1067][0] = 4363 
c    b[1][1068][2] = 4364 b[1][1068][1] = 4365 b[1][1068][0] = 4366 
c    b[1][1069][2] = 4367 b[1][1069][1] = 4368 b[1][1069][0] = 4369 
c    b[1][1070][2] = 4370 b[1][1070][1] = 4371 b[1][1070][0] = 4372 
c    b[1][1071][2] = 4373 b[1][1071][1] = 4374 b[1][1071][0] = 4375 
c    b[1][1072][2] = 4376 b[1][1072][1] = 4377 b[1][1072][0] = 4378 
c    b[1][1073][2] = 4379 b[1][1073][1] = 4380 b[1][1073][0] = 4381 
c    b[1][1074][2] = 4382 b[1][1074][1] = 4383 b[1][1074][0] = 4384 
c    b[1][1075][2] = 4385 b[1][1075][1] = 4386 b[1][1075][0] = 4387 
c    b[1][1076][2] = 4388 b[1][1076][1] = 4389 b[1][1076][0] = 4390 
c    b[1][1077][2] = 4391 b[1][1077][1] = 4392 b[1][1077][0] = 4393 
c    b[1][1078][2] = 4394 b[1][1078][1] = 4395 b[1][1078][0] = 4396 
c    b[1][1079][2] = 4397 b[1][1079][1] = 4398 b[1][1079][0] = 4399 
c    b[1][1080][2] = 4400 b[1][1080][1] = 4401 b[1][1080][0] = 4402 
c    b[1][1081][2] = 4403 b[1][1081][1] = 4404 b[1][1081][0] = 4405 
c    b[1][1082][2] = 4406 b[1][1082][1] = 4407 b[1][1082][0] = 4408 
c    b[1][1083][2] = 4409 b[1][1083][1] = 4410 b[1][1083][0] = 4411 
c    b[1][1084][2] = 4412 b[1][1084][1] = 4413 b[1][1084][0] = 4414 
c    b[1][1085][2] = 4415 b[1][1085][1] = 4416 b[1][1085][0] = 4417 
c    b[1][1086][2] = 4418 b[1][1086][1] = 4419 b[1][1086][0] = 4420 
c    b[1][1087][2] = 4421 b[1][1087][1] = 4422 b[1][1087][0] = 4423 
c    b[1][1088][2] = 4424 b[1][1088][1] = 4425 b[1][1088][0] = 4426 
c    b[1][1089][2] = 4427 b[1][1089][1] = 4428 b[1][1089][0] = 4429 
c    b[1][1090][2] = 4430 b[1][1090][1] = 4431 b[1][1090][0] = 4432 
c    b[1][1091][2] = 4433 b[1][1091][1] = 4434 b[1][1091][0] = 4435 
c    b[1][1092][2] = 4436 b[1][1092][1] = 4437 b[1][1092][0] = 4438 
c    b[1][1093][2] = 4439 b[1][1093][1] = 4440 b[1][1093][0] = 4441 
c    b[1][1094][2] = 4442 b[1][1094][1] = 4443 b[1][1094][0] = 4444 
c    b[1][1095][2] = 4445 b[1][1095][1] = 4446 b[1][1095][0] = 4447 
c    b[1][1096][2] = 4448 b[1][1096][1] = 4449 b[1][1096][0] = 4450 
c    b[1][1097][2] = 4451 b[1][1097][1] = 4452 b[1][1097][0] = 4453 
c    b[1][1098][2] = 4454 b[1][1098][1] = 4455 b[1][1098][0] = 4456 
c    b[1][1099][2] = 4457 b[1][1099][1] = 4458 b[1][1099][0] = 4459 
c    b[1][1100][2] = 4460 b[1][1100][1] = 4461 b[1][1100][0] = 4462 
c    b[1][1101][2] = 4463 b[1][1101][1] = 4464 b[1][1101][0] = 4465 
c    b[1][1102][2] = 4466 b[1][1102][1] = 4467 b[1][1102][0] = 4468 
c    b[1][1103][2] = 4469 b[1][1103][1] = 4470 b[1][1103][0] = 4471 
c    b[1][1104][2] = 4472 b[1][1104][1] = 4473 b[1][1104][0] = 4474 
c    b[1][1105][2] = 4475 b[1][1105][1] = 4476 b[1][1105][0] = 4477 
c    b[1][1106][2] = 4478 b[1][1106][1] = 4479 b[1][1106][0] = 4480 
c    b[1][1107][2] = 4481 b[1][1107][1] = 4482 b[1][1107][0] = 4483 
c    b[1][1108][2] = 4484 b[1][1108][1] = 4485 b[1][1108][0] = 4486 
c    b[1][1109][2] = 4487 b[1][1109][1] = 4488 b[1][1109][0] = 4489 
c    b[1][1110][2] = 4490 b[1][1110][1] = 4491 b[1][1110][0] = 4492 
c    b[1][1111][2] = 4493 b[1][1111][1] = 4494 b[1][1111][0] = 4495 
c    b[1][1112][2] = 4496 b[1][1112][1] = 4497 b[1][1112][0] = 4498 
c    b[1][1113][2] = 4499 b[1][1113][1] = 4500 b[1][1113][0] = 4501 
c    b[1][1114][2] = 4502 b[1][1114][1] = 4503 b[1][1114][0] = 4504 
c    b[1][1115][2] = 4505 b[1][1115][1] = 4506 b[1][1115][0] = 4507 
c    b[1][1116][2] = 4508 b[1][1116][1] = 4509 b[1][1116][0] = 4510 
c    b[1][1117][2] = 4511 b[1][1117][1] = 4512 b[1][1117][0] = 4513 
c    b[1][1118][2] = 4514 b[1][1118][1] = 4515 b[1][1118][0] = 4516 
c    b[1][1119][2] = 4517 b[1][1119][1] = 4518 b[1][1119][0] = 4519 
c    b[1][1120][2] = 4520 b[1][1120][1] = 4521 b[1][1120][0] = 4522 
c    b[1][1121][2] = 4523 b[1][1121][1] = 4524 b[1][1121][0] = 4525 
c    b[1][1122][2] = 4526 b[1][1122][1] = 4527 b[1][1122][0] = 4528 
c    b[1][1123][2] = 4529 b[1][1123][1] = 4530 b[1][1123][0] = 4531 
c    b[1][1124][2] = 4532 b[1][1124][1] = 4533 b[1][1124][0] = 4534 
c    b[1][1125][2] = 4535 b[1][1125][1] = 4536 b[1][1125][0] = 4537 
c    b[1][1126][2] = 4538 b[1][1126][1] = 4539 b[1][1126][0] = 4540 
c    b[1][1127][2] = 4541 b[1][1127][1] = 4542 b[1][1127][0] = 4543 
c    b[1][1128][2] = 4544 b[1][1128][1] = 4545 b[1][1128][0] = 4546 
c    b[1][1129][2] = 4547 b[1][1129][1] = 4548 b[1][1129][0] = 4549 
c    b[1][1130][2] = 4550 b[1][1130][1] = 4551 b[1][1130][0] = 4552 
c    b[1][1131][2] = 4553 b[1][1131][1] = 4554 b[1][1131][0] = 4555 
c    b[1][1132][2] = 4556 b[1][1132][1] = 4557 b[1][1132][0] = 4558 
c    b[1][1133][2] = 4559 b[1][1133][1] = 4560 b[1][1133][0] = 4561 
c    b[1][1134][2] = 4562 b[1][1134][1] = 4563 b[1][1134][0] = 4564 
c    b[1][1135][2] = 4565 b[1][1135][1] = 4566 b[1][1135][0] = 4567 
c    b[1][1136][2] = 4568 b[1][1136][1] = 4569 b[1][1136][0] = 4570 
c    b[1][1137][2] = 4571 b[1][1137][1] = 4572 b[1][1137][0] = 4573 
c    b[1][1138][2] = 4574 b[1][1138][1] = 4575 b[1][1138][0] = 4576 
c    b[1][1139][2] = 4577 b[1][1139][1] = 4578 b[1][1139][0] = 4579 
c    b[1][1140][2] = 4580 b[1][1140][1] = 4581 b[1][1140][0] = 4582 
c    b[1][1141][2] = 4583 b[1][1141][1] = 4584 b[1][1141][0] = 4585 
c    b[1][1142][2] = 4586 b[1][1142][1] = 4587 b[1][1142][0] = 4588 
c    b[1][1143][2] = 4589 b[1][1143][1] = 4590 b[1][1143][0] = 4591 
c    b[1][1144][2] = 4592 b[1][1144][1] = 4593 b[1][1144][0] = 4594 
c    b[1][1145][2] = 4595 b[1][1145][1] = 4596 b[1][1145][0] = 4597 
c    b[1][1146][2] = 4598 b[1][1146][1] = 4599 b[1][1146][0] = 4600 
c    b[1][1147][2] = 4601 b[1][1147][1] = 4602 b[1][1147][0] = 4603 
c    b[1][1148][2] = 4604 b[1][1148][1] = 4605 b[1][1148][0] = 4606 
c    b[1][1149][2] = 4607 b[1][1149][1] = 4608 b[1][1149][0] = 4609 
c    b[1][1150][2] = 4610 b[1][1150][1] = 4611 b[1][1150][0] = 4612 
c    b[1][1151][2] = 4613 b[1][1151][1] = 4614 b[1][1151][0] = 4615 
c    b[1][1152][2] = 4616 b[1][1152][1] = 4617 b[1][1152][0] = 4618 
c    b[1][1153][2] = 4619 b[1][1153][1] = 4620 b[1][1153][0] = 4621 
c    b[1][1154][2] = 4622 b[1][1154][1] = 4623 b[1][1154][0] = 4624 
c    b[1][1155][2] = 4625 b[1][1155][1] = 4626 b[1][1155][0] = 4627 
c    b[1][1156][2] = 4628 b[1][1156][1] = 4629 b[1][1156][0] = 4630 
c    b[1][1157][2] = 4631 b[1][1157][1] = 4632 b[1][1157][0] = 4633 
c    b[1][1158][2] = 4634 b[1][1158][1] = 4635 b[1][1158][0] = 4636 
c    b[1][1159][2] = 4637 b[1][1159][1] = 4638 b[1][1159][0] = 4639 
c    b[1][1160][2] = 4640 b[1][1160][1] = 4641 b[1][1160][0] = 4642 
c    b[1][1161][2] = 4643 b[1][1161][1] = 4644 b[1][1161][0] = 4645 
c    b[1][1162][2] = 4646 b[1][1162][1] = 4647 b[1][1162][0] = 4648 

c    b[2][1][2] = 4649 b[2][1][1] = 4650 b[2][1][0] = 4651 
c    b[2][2][2] = 4652 b[2][2][1] = 4653 b[2][2][0] = 4654 
c    b[2][3][2] = 4655 b[2][3][1] = 4656 b[2][3][0] = 4657 
c    b[2][4][2] = 4658 b[2][4][1] = 4659 b[2][4][0] = 4660 
c    b[2][5][2] = 4661 b[2][5][1] = 4662 b[2][5][0] = 4663 
c    b[2][6][2] = 4664 b[2][6][1] = 4665 b[2][6][0] = 4666 
c    b[2][7][2] = 4667 b[2][7][1] = 4668 b[2][7][0] = 4669 
c    b[2][8][2] = 4670 b[2][8][1] = 4671 b[2][8][0] = 4672 
c    b[2][9][2] = 4673 b[2][9][1] = 4674 b[2][9][0] = 4675 
c    b[2][10][2] = 4676 b[2][10][1] = 4677 b[2][10][0] = 4678 
c    b[2][11][2] = 4679 b[2][11][1] = 4680 b[2][11][0] = 4681 
c    b[2][12][2] = 4682 b[2][12][1] = 4683 b[2][12][0] = 4684 
c    b[2][13][2] = 4685 b[2][13][1] = 4686 b[2][13][0] = 4687 
c    b[2][14][2] = 4688 b[2][14][1] = 4689 b[2][14][0] = 4690 
c    b[2][15][2] = 4691 b[2][15][1] = 4692 b[2][15][0] = 4693 
c    b[2][16][2] = 4694 b[2][16][1] = 4695 b[2][16][0] = 4696 
c    b[2][17][2] = 4697 b[2][17][1] = 4698 b[2][17][0] = 4699 
c    b[2][18][2] = 4700 b[2][18][1] = 4701 b[2][18][0] = 4702 
c    b[2][19][2] = 4703 b[2][19][1] = 4704 b[2][19][0] = 4705 
c    b[2][20][2] = 4706 b[2][20][1] = 4707 b[2][20][0] = 4708 
c    b[2][21][2] = 4709 b[2][21][1] = 4710 b[2][21][0] = 4711 
c    b[2][22][2] = 4712 b[2][22][1] = 4713 b[2][22][0] = 4714 
c    b[2][23][2] = 4715 b[2][23][1] = 4716 b[2][23][0] = 4717 
c    b[2][24][2] = 4718 b[2][24][1] = 4719 b[2][24][0] = 4720 
c    b[2][25][2] = 4721 b[2][25][1] = 4722 b[2][25][0] = 4723 
c    b[2][26][2] = 4724 b[2][26][1] = 4725 b[2][26][0] = 4726 
c    b[2][27][2] = 4727 b[2][27][1] = 4728 b[2][27][0] = 4729 
c    b[2][28][2] = 4730 b[2][28][1] = 4731 b[2][28][0] = 4732 
c    b[2][29][2] = 4733 b[2][29][1] = 4734 b[2][29][0] = 4735 
c    b[2][30][2] = 4736 b[2][30][1] = 4737 b[2][30][0] = 4738 
c    b[2][31][2] = 4739 b[2][31][1] = 4740 b[2][31][0] = 4741 
c    b[2][32][2] = 4742 b[2][32][1] = 4743 b[2][32][0] = 4744 
c    b[2][33][2] = 4745 b[2][33][1] = 4746 b[2][33][0] = 4747 
c    b[2][34][2] = 4748 b[2][34][1] = 4749 b[2][34][0] = 4750 
c    b[2][35][2] = 4751 b[2][35][1] = 4752 b[2][35][0] = 4753 
c    b[2][36][2] = 4754 b[2][36][1] = 4755 b[2][36][0] = 4756 
c    b[2][37][2] = 4757 b[2][37][1] = 4758 b[2][37][0] = 4759 
c    b[2][38][2] = 4760 b[2][38][1] = 4761 b[2][38][0] = 4762 
c    b[2][39][2] = 4763 b[2][39][1] = 4764 b[2][39][0] = 4765 
c    b[2][40][2] = 4766 b[2][40][1] = 4767 b[2][40][0] = 4768 
c    b[2][41][2] = 4769 b[2][41][1] = 4770 b[2][41][0] = 4771 
c    b[2][42][2] = 4772 b[2][42][1] = 4773 b[2][42][0] = 4774 
c    b[2][43][2] = 4775 b[2][43][1] = 4776 b[2][43][0] = 4777 
c    b[2][44][2] = 4778 b[2][44][1] = 4779 b[2][44][0] = 4780 
c    b[2][45][2] = 4781 b[2][45][1] = 4782 b[2][45][0] = 4783 
c    b[2][46][2] = 4784 b[2][46][1] = 4785 b[2][46][0] = 4786 
c    b[2][47][2] = 4787 b[2][47][1] = 4788 b[2][47][0] = 4789 
c    b[2][48][2] = 4790 b[2][48][1] = 4791 b[2][48][0] = 4792 
c    b[2][49][2] = 4793 b[2][49][1] = 4794 b[2][49][0] = 4795 
c    b[2][50][2] = 4796 b[2][50][1] = 4797 b[2][50][0] = 4798 
c    b[2][51][2] = 4799 b[2][51][1] = 4800 b[2][51][0] = 4801 
c    b[2][52][2] = 4802 b[2][52][1] = 4803 b[2][52][0] = 4804 
c    b[2][53][2] = 4805 b[2][53][1] = 4806 b[2][53][0] = 4807 
c    b[2][54][2] = 4808 b[2][54][1] = 4809 b[2][54][0] = 4810 
c    b[2][55][2] = 4811 b[2][55][1] = 4812 b[2][55][0] = 4813 
c    b[2][56][2] = 4814 b[2][56][1] = 4815 b[2][56][0] = 4816 
c    b[2][57][2] = 4817 b[2][57][1] = 4818 b[2][57][0] = 4819 
c    b[2][58][2] = 4820 b[2][58][1] = 4821 b[2][58][0] = 4822 
c    b[2][59][2] = 4823 b[2][59][1] = 4824 b[2][59][0] = 4825 
c    b[2][60][2] = 4826 b[2][60][1] = 4827 b[2][60][0] = 4828 
c    b[2][61][2] = 4829 b[2][61][1] = 4830 b[2][61][0] = 4831 
c    b[2][62][2] = 4832 b[2][62][1] = 4833 b[2][62][0] = 4834 
c    b[2][63][2] = 4835 b[2][63][1] = 4836 b[2][63][0] = 4837 
c    b[2][64][2] = 4838 b[2][64][1] = 4839 b[2][64][0] = 4840 
c    b[2][65][2] = 4841 b[2][65][1] = 4842 b[2][65][0] = 4843 
c    b[2][66][2] = 4844 b[2][66][1] = 4845 b[2][66][0] = 4846 
c    b[2][67][2] = 4847 b[2][67][1] = 4848 b[2][67][0] = 4849 
c    b[2][68][2] = 4850 b[2][68][1] = 4851 b[2][68][0] = 4852 
c    b[2][69][2] = 4853 b[2][69][1] = 4854 b[2][69][0] = 4855 
c    b[2][70][2] = 4856 b[2][70][1] = 4857 b[2][70][0] = 4858 
c    b[2][71][2] = 4859 b[2][71][1] = 4860 b[2][71][0] = 4861 
c    b[2][72][2] = 4862 b[2][72][1] = 4863 b[2][72][0] = 4864 
c    b[2][73][2] = 4865 b[2][73][1] = 4866 b[2][73][0] = 4867 
c    b[2][74][2] = 4868 b[2][74][1] = 4869 b[2][74][0] = 4870 
c    b[2][75][2] = 4871 b[2][75][1] = 4872 b[2][75][0] = 4873 
c    b[2][76][2] = 4874 b[2][76][1] = 4875 b[2][76][0] = 4876 
c    b[2][77][2] = 4877 b[2][77][1] = 4878 b[2][77][0] = 4879 
c    b[2][78][2] = 4880 b[2][78][1] = 4881 b[2][78][0] = 4882 
c    b[2][79][2] = 4883 b[2][79][1] = 4884 b[2][79][0] = 4885 
c    b[2][80][2] = 4886 b[2][80][1] = 4887 b[2][80][0] = 4888 
c    b[2][81][2] = 4889 b[2][81][1] = 4890 b[2][81][0] = 4891 
c    b[2][82][2] = 4892 b[2][82][1] = 4893 b[2][82][0] = 4894 
c    b[2][83][2] = 4895 b[2][83][1] = 4896 b[2][83][0] = 4897 
c    b[2][84][2] = 4898 b[2][84][1] = 4899 b[2][84][0] = 4900 
c    b[2][85][2] = 4901 b[2][85][1] = 4902 b[2][85][0] = 4903 
c    b[2][86][2] = 4904 b[2][86][1] = 4905 b[2][86][0] = 4906 
c    b[2][87][2] = 4907 b[2][87][1] = 4908 b[2][87][0] = 4909 
c    b[2][88][2] = 4910 b[2][88][1] = 4911 b[2][88][0] = 4912 
c    b[2][89][2] = 4913 b[2][89][1] = 4914 b[2][89][0] = 4915 
c    b[2][90][2] = 4916 b[2][90][1] = 4917 b[2][90][0] = 4918 
c    b[2][91][2] = 4919 b[2][91][1] = 4920 b[2][91][0] = 4921 
c    b[2][92][2] = 4922 b[2][92][1] = 4923 b[2][92][0] = 4924 
c    b[2][93][2] = 4925 b[2][93][1] = 4926 b[2][93][0] = 4927 
c    b[2][94][2] = 4928 b[2][94][1] = 4929 b[2][94][0] = 4930 
c    b[2][95][2] = 4931 b[2][95][1] = 4932 b[2][95][0] = 4933 
c    b[2][96][2] = 4934 b[2][96][1] = 4935 b[2][96][0] = 4936 
c    b[2][97][2] = 4937 b[2][97][1] = 4938 b[2][97][0] = 4939 
c    b[2][98][2] = 4940 b[2][98][1] = 4941 b[2][98][0] = 4942 
c    b[2][99][2] = 4943 b[2][99][1] = 4944 b[2][99][0] = 4945 
c    b[2][100][2] = 4946 b[2][100][1] = 4947 b[2][100][0] = 4948 
c    b[2][101][2] = 4949 b[2][101][1] = 4950 b[2][101][0] = 4951 
c    b[2][102][2] = 4952 b[2][102][1] = 4953 b[2][102][0] = 4954 
c    b[2][103][2] = 4955 b[2][103][1] = 4956 b[2][103][0] = 4957 
c    b[2][104][2] = 4958 b[2][104][1] = 4959 b[2][104][0] = 4960 
c    b[2][105][2] = 4961 b[2][105][1] = 4962 b[2][105][0] = 4963 
c    b[2][106][2] = 4964 b[2][106][1] = 4965 b[2][106][0] = 4966 
c    b[2][107][2] = 4967 b[2][107][1] = 4968 b[2][107][0] = 4969 
c    b[2][108][2] = 4970 b[2][108][1] = 4971 b[2][108][0] = 4972 
c    b[2][109][2] = 4973 b[2][109][1] = 4974 b[2][109][0] = 4975 
c    b[2][110][2] = 4976 b[2][110][1] = 4977 b[2][110][0] = 4978 
c    b[2][111][2] = 4979 b[2][111][1] = 4980 b[2][111][0] = 4981 
c    b[2][112][2] = 4982 b[2][112][1] = 4983 b[2][112][0] = 4984 
c    b[2][113][2] = 4985 b[2][113][1] = 4986 b[2][113][0] = 4987 
c    b[2][114][2] = 4988 b[2][114][1] = 4989 b[2][114][0] = 4990 
c    b[2][115][2] = 4991 b[2][115][1] = 4992 b[2][115][0] = 4993 
c    b[2][116][2] = 4994 b[2][116][1] = 4995 b[2][116][0] = 4996 
c    b[2][117][2] = 4997 b[2][117][1] = 4998 b[2][117][0] = 4999 
c    b[2][118][2] = 5000 b[2][118][1] = 5001 b[2][118][0] = 5002 
c    b[2][119][2] = 5003 b[2][119][1] = 5004 b[2][119][0] = 5005 
c    b[2][120][2] = 5006 b[2][120][1] = 5007 b[2][120][0] = 5008 
c    b[2][121][2] = 5009 b[2][121][1] = 5010 b[2][121][0] = 5011 
c    b[2][122][2] = 5012 b[2][122][1] = 5013 b[2][122][0] = 5014 
c    b[2][123][2] = 5015 b[2][123][1] = 5016 b[2][123][0] = 5017 
c    b[2][124][2] = 5018 b[2][124][1] = 5019 b[2][124][0] = 5020 
c    b[2][125][2] = 5021 b[2][125][1] = 5022 b[2][125][0] = 5023 
c    b[2][126][2] = 5024 b[2][126][1] = 5025 b[2][126][0] = 5026 
c    b[2][127][2] = 5027 b[2][127][1] = 5028 b[2][127][0] = 5029 
c    b[2][128][2] = 5030 b[2][128][1] = 5031 b[2][128][0] = 5032 
c    b[2][129][2] = 5033 b[2][129][1] = 5034 b[2][129][0] = 5035 
c    b[2][130][2] = 5036 b[2][130][1] = 5037 b[2][130][0] = 5038 
c    b[2][131][2] = 5039 b[2][131][1] = 5040 b[2][131][0] = 5041 
c    b[2][132][2] = 5042 b[2][132][1] = 5043 b[2][132][0] = 5044 
c    b[2][133][2] = 5045 b[2][133][1] = 5046 b[2][133][0] = 5047 
c    b[2][134][2] = 5048 b[2][134][1] = 5049 b[2][134][0] = 5050 
c    b[2][135][2] = 5051 b[2][135][1] = 5052 b[2][135][0] = 5053 
c    b[2][136][2] = 5054 b[2][136][1] = 5055 b[2][136][0] = 5056 
c    b[2][137][2] = 5057 b[2][137][1] = 5058 b[2][137][0] = 5059 
c    b[2][138][2] = 5060 b[2][138][1] = 5061 b[2][138][0] = 5062 
c    b[2][139][2] = 5063 b[2][139][1] = 5064 b[2][139][0] = 5065 
c    b[2][140][2] = 5066 b[2][140][1] = 5067 b[2][140][0] = 5068 
c    b[2][141][2] = 5069 b[2][141][1] = 5070 b[2][141][0] = 5071 
c    b[2][142][2] = 5072 b[2][142][1] = 5073 b[2][142][0] = 5074 
c    b[2][143][2] = 5075 b[2][143][1] = 5076 b[2][143][0] = 5077 
c    b[2][144][2] = 5078 b[2][144][1] = 5079 b[2][144][0] = 5080 
c    b[2][145][2] = 5081 b[2][145][1] = 5082 b[2][145][0] = 5083 
c    b[2][146][2] = 5084 b[2][146][1] = 5085 b[2][146][0] = 5086 
c    b[2][147][2] = 5087 b[2][147][1] = 5088 b[2][147][0] = 5089 
c    b[2][148][2] = 5090 b[2][148][1] = 5091 b[2][148][0] = 5092 
c    b[2][149][2] = 5093 b[2][149][1] = 5094 b[2][149][0] = 5095 
c    b[2][150][2] = 5096 b[2][150][1] = 5097 b[2][150][0] = 5098 
c    b[2][151][2] = 5099 b[2][151][1] = 5100 b[2][151][0] = 5101 
c    b[2][152][2] = 5102 b[2][152][1] = 5103 b[2][152][0] = 5104 
c    b[2][153][2] = 5105 b[2][153][1] = 5106 b[2][153][0] = 5107 
c    b[2][154][2] = 5108 b[2][154][1] = 5109 b[2][154][0] = 5110 
c    b[2][155][2] = 5111 b[2][155][1] = 5112 b[2][155][0] = 5113 
c    b[2][156][2] = 5114 b[2][156][1] = 5115 b[2][156][0] = 5116 
c    b[2][157][2] = 5117 b[2][157][1] = 5118 b[2][157][0] = 5119 
c    b[2][158][2] = 5120 b[2][158][1] = 5121 b[2][158][0] = 5122 
c    b[2][159][2] = 5123 b[2][159][1] = 5124 b[2][159][0] = 5125 
c    b[2][160][2] = 5126 b[2][160][1] = 5127 b[2][160][0] = 5128 
c    b[2][161][2] = 5129 b[2][161][1] = 5130 b[2][161][0] = 5131 
c    b[2][162][2] = 5132 b[2][162][1] = 5133 b[2][162][0] = 5134 
c    b[2][163][2] = 5135 b[2][163][1] = 5136 b[2][163][0] = 5137 
c    b[2][164][2] = 5138 b[2][164][1] = 5139 b[2][164][0] = 5140 
c    b[2][165][2] = 5141 b[2][165][1] = 5142 b[2][165][0] = 5143 
c    b[2][166][2] = 5144 b[2][166][1] = 5145 b[2][166][0] = 5146 
c    b[2][167][2] = 5147 b[2][167][1] = 5148 b[2][167][0] = 5149 
c    b[2][168][2] = 5150 b[2][168][1] = 5151 b[2][168][0] = 5152 
c    b[2][169][2] = 5153 b[2][169][1] = 5154 b[2][169][0] = 5155 
c    b[2][170][2] = 5156 b[2][170][1] = 5157 b[2][170][0] = 5158 
c    b[2][171][2] = 5159 b[2][171][1] = 5160 b[2][171][0] = 5161 
c    b[2][172][2] = 5162 b[2][172][1] = 5163 b[2][172][0] = 5164 
c    b[2][173][2] = 5165 b[2][173][1] = 5166 b[2][173][0] = 5167 
c    b[2][174][2] = 5168 b[2][174][1] = 5169 b[2][174][0] = 5170 
c    b[2][175][2] = 5171 b[2][175][1] = 5172 b[2][175][0] = 5173 
c    b[2][176][2] = 5174 b[2][176][1] = 5175 b[2][176][0] = 5176 
c    b[2][177][2] = 5177 b[2][177][1] = 5178 b[2][177][0] = 5179 
c    b[2][178][2] = 5180 b[2][178][1] = 5181 b[2][178][0] = 5182 
c    b[2][179][2] = 5183 b[2][179][1] = 5184 b[2][179][0] = 5185 
c    b[2][180][2] = 5186 b[2][180][1] = 5187 b[2][180][0] = 5188 
c    b[2][181][2] = 5189 b[2][181][1] = 5190 b[2][181][0] = 5191 
c    b[2][182][2] = 5192 b[2][182][1] = 5193 b[2][182][0] = 5194 
c    b[2][183][2] = 5195 b[2][183][1] = 5196 b[2][183][0] = 5197 
c    b[2][184][2] = 5198 b[2][184][1] = 5199 b[2][184][0] = 5200 
c    b[2][185][2] = 5201 b[2][185][1] = 5202 b[2][185][0] = 5203 
c    b[2][186][2] = 5204 b[2][186][1] = 5205 b[2][186][0] = 5206 
c    b[2][187][2] = 5207 b[2][187][1] = 5208 b[2][187][0] = 5209 
c    b[2][188][2] = 5210 b[2][188][1] = 5211 b[2][188][0] = 5212 
c    b[2][189][2] = 5213 b[2][189][1] = 5214 b[2][189][0] = 5215 
c    b[2][190][2] = 5216 b[2][190][1] = 5217 b[2][190][0] = 5218 
c    b[2][191][2] = 5219 b[2][191][1] = 5220 b[2][191][0] = 5221 
c    b[2][192][2] = 5222 b[2][192][1] = 5223 b[2][192][0] = 5224 
c    b[2][193][2] = 5225 b[2][193][1] = 5226 b[2][193][0] = 5227 
c    b[2][194][2] = 5228 b[2][194][1] = 5229 b[2][194][0] = 5230 
c    b[2][195][2] = 5231 b[2][195][1] = 5232 b[2][195][0] = 5233 
c    b[2][196][2] = 5234 b[2][196][1] = 5235 b[2][196][0] = 5236 
c    b[2][197][2] = 5237 b[2][197][1] = 5238 b[2][197][0] = 5239 
c    b[2][198][2] = 5240 b[2][198][1] = 5241 b[2][198][0] = 5242 
c    b[2][199][2] = 5243 b[2][199][1] = 5244 b[2][199][0] = 5245 
c    b[2][200][2] = 5246 b[2][200][1] = 5247 b[2][200][0] = 5248 
c    b[2][201][2] = 5249 b[2][201][1] = 5250 b[2][201][0] = 5251 
c    b[2][202][2] = 5252 b[2][202][1] = 5253 b[2][202][0] = 5254 
c    b[2][203][2] = 5255 b[2][203][1] = 5256 b[2][203][0] = 5257 
c    b[2][204][2] = 5258 b[2][204][1] = 5259 b[2][204][0] = 5260 
c    b[2][205][2] = 5261 b[2][205][1] = 5262 b[2][205][0] = 5263 
c    b[2][206][2] = 5264 b[2][206][1] = 5265 b[2][206][0] = 5266 
c    b[2][207][2] = 5267 b[2][207][1] = 5268 b[2][207][0] = 5269 
c    b[2][208][2] = 5270 b[2][208][1] = 5271 b[2][208][0] = 5272 
c    b[2][209][2] = 5273 b[2][209][1] = 5274 b[2][209][0] = 5275 
c    b[2][210][2] = 5276 b[2][210][1] = 5277 b[2][210][0] = 5278 
c    b[2][211][2] = 5279 b[2][211][1] = 5280 b[2][211][0] = 5281 
c    b[2][212][2] = 5282 b[2][212][1] = 5283 b[2][212][0] = 5284 
c    b[2][213][2] = 5285 b[2][213][1] = 5286 b[2][213][0] = 5287 
c    b[2][214][2] = 5288 b[2][214][1] = 5289 b[2][214][0] = 5290 
c    b[2][215][2] = 5291 b[2][215][1] = 5292 b[2][215][0] = 5293 
c    b[2][216][2] = 5294 b[2][216][1] = 5295 b[2][216][0] = 5296 
c    b[2][217][2] = 5297 b[2][217][1] = 5298 b[2][217][0] = 5299 
c    b[2][218][2] = 5300 b[2][218][1] = 5301 b[2][218][0] = 5302 
c    b[2][219][2] = 5303 b[2][219][1] = 5304 b[2][219][0] = 5305 
c    b[2][220][2] = 5306 b[2][220][1] = 5307 b[2][220][0] = 5308 
c    b[2][221][2] = 5309 b[2][221][1] = 5310 b[2][221][0] = 5311 
c    b[2][222][2] = 5312 b[2][222][1] = 5313 b[2][222][0] = 5314 
c    b[2][223][2] = 5315 b[2][223][1] = 5316 b[2][223][0] = 5317 
c    b[2][224][2] = 5318 b[2][224][1] = 5319 b[2][224][0] = 5320 
c    b[2][225][2] = 5321 b[2][225][1] = 5322 b[2][225][0] = 5323 
c    b[2][226][2] = 5324 b[2][226][1] = 5325 b[2][226][0] = 5326 
c    b[2][227][2] = 5327 b[2][227][1] = 5328 b[2][227][0] = 5329 
c    b[2][228][2] = 5330 b[2][228][1] = 5331 b[2][228][0] = 5332 
c    b[2][229][2] = 5333 b[2][229][1] = 5334 b[2][229][0] = 5335 
c    b[2][230][2] = 5336 b[2][230][1] = 5337 b[2][230][0] = 5338 
c    b[2][231][2] = 5339 b[2][231][1] = 5340 b[2][231][0] = 5341 
c    b[2][232][2] = 5342 b[2][232][1] = 5343 b[2][232][0] = 5344 
c    b[2][233][2] = 5345 b[2][233][1] = 5346 b[2][233][0] = 5347 
c    b[2][234][2] = 5348 b[2][234][1] = 5349 b[2][234][0] = 5350 
c    b[2][235][2] = 5351 b[2][235][1] = 5352 b[2][235][0] = 5353 
c    b[2][236][2] = 5354 b[2][236][1] = 5355 b[2][236][0] = 5356 
c    b[2][237][2] = 5357 b[2][237][1] = 5358 b[2][237][0] = 5359 
c    b[2][238][2] = 5360 b[2][238][1] = 5361 b[2][238][0] = 5362 
c    b[2][239][2] = 5363 b[2][239][1] = 5364 b[2][239][0] = 5365 
c    b[2][240][2] = 5366 b[2][240][1] = 5367 b[2][240][0] = 5368 
c    b[2][241][2] = 5369 b[2][241][1] = 5370 b[2][241][0] = 5371 
c    b[2][242][2] = 5372 b[2][242][1] = 5373 b[2][242][0] = 5374 
c    b[2][243][2] = 5375 b[2][243][1] = 5376 b[2][243][0] = 5377 
c    b[2][244][2] = 5378 b[2][244][1] = 5379 b[2][244][0] = 5380 
c    b[2][245][2] = 5381 b[2][245][1] = 5382 b[2][245][0] = 5383 
c    b[2][246][2] = 5384 b[2][246][1] = 5385 b[2][246][0] = 5386 
c    b[2][247][2] = 5387 b[2][247][1] = 5388 b[2][247][0] = 5389 
c    b[2][248][2] = 5390 b[2][248][1] = 5391 b[2][248][0] = 5392 
c    b[2][249][2] = 5393 b[2][249][1] = 5394 b[2][249][0] = 5395 
c    b[2][250][2] = 5396 b[2][250][1] = 5397 b[2][250][0] = 5398 
c    b[2][251][2] = 5399 b[2][251][1] = 5400 b[2][251][0] = 5401 
c    b[2][252][2] = 5402 b[2][252][1] = 5403 b[2][252][0] = 5404 
c    b[2][253][2] = 5405 b[2][253][1] = 5406 b[2][253][0] = 5407 
c    b[2][254][2] = 5408 b[2][254][1] = 5409 b[2][254][0] = 5410 
c    b[2][255][2] = 5411 b[2][255][1] = 5412 b[2][255][0] = 5413 
c    b[2][256][2] = 5414 b[2][256][1] = 5415 b[2][256][0] = 5416 
c    b[2][257][2] = 5417 b[2][257][1] = 5418 b[2][257][0] = 5419 
c    b[2][258][2] = 5420 b[2][258][1] = 5421 b[2][258][0] = 5422 
c    b[2][259][2] = 5423 b[2][259][1] = 5424 b[2][259][0] = 5425 
c    b[2][260][2] = 5426 b[2][260][1] = 5427 b[2][260][0] = 5428 
c    b[2][261][2] = 5429 b[2][261][1] = 5430 b[2][261][0] = 5431 
c    b[2][262][2] = 5432 b[2][262][1] = 5433 b[2][262][0] = 5434 
c    b[2][263][2] = 5435 b[2][263][1] = 5436 b[2][263][0] = 5437 
c    b[2][264][2] = 5438 b[2][264][1] = 5439 b[2][264][0] = 5440 
c    b[2][265][2] = 5441 b[2][265][1] = 5442 b[2][265][0] = 5443 
c    b[2][266][2] = 5444 b[2][266][1] = 5445 b[2][266][0] = 5446 
c    b[2][267][2] = 5447 b[2][267][1] = 5448 b[2][267][0] = 5449 
c    b[2][268][2] = 5450 b[2][268][1] = 5451 b[2][268][0] = 5452 
c    b[2][269][2] = 5453 b[2][269][1] = 5454 b[2][269][0] = 5455 
c    b[2][270][2] = 5456 b[2][270][1] = 5457 b[2][270][0] = 5458 
c    b[2][271][2] = 5459 b[2][271][1] = 5460 b[2][271][0] = 5461 
c    b[2][272][2] = 5462 b[2][272][1] = 5463 b[2][272][0] = 5464 
c    b[2][273][2] = 5465 b[2][273][1] = 5466 b[2][273][0] = 5467 
c    b[2][274][2] = 5468 b[2][274][1] = 5469 b[2][274][0] = 5470 
c    b[2][275][2] = 5471 b[2][275][1] = 5472 b[2][275][0] = 5473 
c    b[2][276][2] = 5474 b[2][276][1] = 5475 b[2][276][0] = 5476 
c    b[2][277][2] = 5477 b[2][277][1] = 5478 b[2][277][0] = 5479 
c    b[2][278][2] = 5480 b[2][278][1] = 5481 b[2][278][0] = 5482 
c    b[2][279][2] = 5483 b[2][279][1] = 5484 b[2][279][0] = 5485 
c    b[2][280][2] = 5486 b[2][280][1] = 5487 b[2][280][0] = 5488 
c    b[2][281][2] = 5489 b[2][281][1] = 5490 b[2][281][0] = 5491 
c    b[2][282][2] = 5492 b[2][282][1] = 5493 b[2][282][0] = 5494 
c    b[2][283][2] = 5495 b[2][283][1] = 5496 b[2][283][0] = 5497 
c    b[2][284][2] = 5498 b[2][284][1] = 5499 b[2][284][0] = 5500 
c    b[2][285][2] = 5501 b[2][285][1] = 5502 b[2][285][0] = 5503 
c    b[2][286][2] = 5504 b[2][286][1] = 5505 b[2][286][0] = 5506 
c    b[2][287][2] = 5507 b[2][287][1] = 5508 b[2][287][0] = 5509 
c    b[2][288][2] = 5510 b[2][288][1] = 5511 b[2][288][0] = 5512 
c    b[2][289][2] = 5513 b[2][289][1] = 5514 b[2][289][0] = 5515 
c    b[2][290][2] = 5516 b[2][290][1] = 5517 b[2][290][0] = 5518 
c    b[2][291][2] = 5519 b[2][291][1] = 5520 b[2][291][0] = 5521 
c    b[2][292][2] = 5522 b[2][292][1] = 5523 b[2][292][0] = 5524 
c    b[2][293][2] = 5525 b[2][293][1] = 5526 b[2][293][0] = 5527 
c    b[2][294][2] = 5528 b[2][294][1] = 5529 b[2][294][0] = 5530 
c    b[2][295][2] = 5531 b[2][295][1] = 5532 b[2][295][0] = 5533 
c    b[2][296][2] = 5534 b[2][296][1] = 5535 b[2][296][0] = 5536 
c    b[2][297][2] = 5537 b[2][297][1] = 5538 b[2][297][0] = 5539 
c    b[2][298][2] = 5540 b[2][298][1] = 5541 b[2][298][0] = 5542 
c    b[2][299][2] = 5543 b[2][299][1] = 5544 b[2][299][0] = 5545 
c    b[2][300][2] = 5546 b[2][300][1] = 5547 b[2][300][0] = 5548 
c    b[2][301][2] = 5549 b[2][301][1] = 5550 b[2][301][0] = 5551 
c    b[2][302][2] = 5552 b[2][302][1] = 5553 b[2][302][0] = 5554 
c    b[2][303][2] = 5555 b[2][303][1] = 5556 b[2][303][0] = 5557 
c    b[2][304][2] = 5558 b[2][304][1] = 5559 b[2][304][0] = 5560 
c    b[2][305][2] = 5561 b[2][305][1] = 5562 b[2][305][0] = 5563 
c    b[2][306][2] = 5564 b[2][306][1] = 5565 b[2][306][0] = 5566 
c    b[2][307][2] = 5567 b[2][307][1] = 5568 b[2][307][0] = 5569 
c    b[2][308][2] = 5570 b[2][308][1] = 5571 b[2][308][0] = 5572 
c    b[2][309][2] = 5573 b[2][309][1] = 5574 b[2][309][0] = 5575 
c    b[2][310][2] = 5576 b[2][310][1] = 5577 b[2][310][0] = 5578 
c    b[2][311][2] = 5579 b[2][311][1] = 5580 b[2][311][0] = 5581 
c    b[2][312][2] = 5582 b[2][312][1] = 5583 b[2][312][0] = 5584 
c    b[2][313][2] = 5585 b[2][313][1] = 5586 b[2][313][0] = 5587 
c    b[2][314][2] = 5588 b[2][314][1] = 5589 b[2][314][0] = 5590 
c    b[2][315][2] = 5591 b[2][315][1] = 5592 b[2][315][0] = 5593 
c    b[2][316][2] = 5594 b[2][316][1] = 5595 b[2][316][0] = 5596 
c    b[2][317][2] = 5597 b[2][317][1] = 5598 b[2][317][0] = 5599 
c    b[2][318][2] = 5600 b[2][318][1] = 5601 b[2][318][0] = 5602 
c    b[2][319][2] = 5603 b[2][319][1] = 5604 b[2][319][0] = 5605 
c    b[2][320][2] = 5606 b[2][320][1] = 5607 b[2][320][0] = 5608 
c    b[2][321][2] = 5609 b[2][321][1] = 5610 b[2][321][0] = 5611 
c    b[2][322][2] = 5612 b[2][322][1] = 5613 b[2][322][0] = 5614 
c    b[2][323][2] = 5615 b[2][323][1] = 5616 b[2][323][0] = 5617 
c    b[2][324][2] = 5618 b[2][324][1] = 5619 b[2][324][0] = 5620 
c    b[2][325][2] = 5621 b[2][325][1] = 5622 b[2][325][0] = 5623 
c    b[2][326][2] = 5624 b[2][326][1] = 5625 b[2][326][0] = 5626 
c    b[2][327][2] = 5627 b[2][327][1] = 5628 b[2][327][0] = 5629 
c    b[2][328][2] = 5630 b[2][328][1] = 5631 b[2][328][0] = 5632 
c    b[2][329][2] = 5633 b[2][329][1] = 5634 b[2][329][0] = 5635 
c    b[2][330][2] = 5636 b[2][330][1] = 5637 b[2][330][0] = 5638 
c    b[2][331][2] = 5639 b[2][331][1] = 5640 b[2][331][0] = 5641 
c    b[2][332][2] = 5642 b[2][332][1] = 5643 b[2][332][0] = 5644 
c    b[2][333][2] = 5645 b[2][333][1] = 5646 b[2][333][0] = 5647 
c    b[2][334][2] = 5648 b[2][334][1] = 5649 b[2][334][0] = 5650 
c    b[2][335][2] = 5651 b[2][335][1] = 5652 b[2][335][0] = 5653 
c    b[2][336][2] = 5654 b[2][336][1] = 5655 b[2][336][0] = 5656 
c    b[2][337][2] = 5657 b[2][337][1] = 5658 b[2][337][0] = 5659 
c    b[2][338][2] = 5660 b[2][338][1] = 5661 b[2][338][0] = 5662 
c    b[2][339][2] = 5663 b[2][339][1] = 5664 b[2][339][0] = 5665 
c    b[2][340][2] = 5666 b[2][340][1] = 5667 b[2][340][0] = 5668 
c    b[2][341][2] = 5669 b[2][341][1] = 5670 b[2][341][0] = 5671 
c    b[2][342][2] = 5672 b[2][342][1] = 5673 b[2][342][0] = 5674 
c    b[2][343][2] = 5675 b[2][343][1] = 5676 b[2][343][0] = 5677 
c    b[2][344][2] = 5678 b[2][344][1] = 5679 b[2][344][0] = 5680 
c    b[2][345][2] = 5681 b[2][345][1] = 5682 b[2][345][0] = 5683 
c    b[2][346][2] = 5684 b[2][346][1] = 5685 b[2][346][0] = 5686 
c    b[2][347][2] = 5687 b[2][347][1] = 5688 b[2][347][0] = 5689 
c    b[2][348][2] = 5690 b[2][348][1] = 5691 b[2][348][0] = 5692 
c    b[2][349][2] = 5693 b[2][349][1] = 5694 b[2][349][0] = 5695 
c    b[2][350][2] = 5696 b[2][350][1] = 5697 b[2][350][0] = 5698 
c    b[2][351][2] = 5699 b[2][351][1] = 5700 b[2][351][0] = 5701 
c    b[2][352][2] = 5702 b[2][352][1] = 5703 b[2][352][0] = 5704 
c    b[2][353][2] = 5705 b[2][353][1] = 5706 b[2][353][0] = 5707 
c    b[2][354][2] = 5708 b[2][354][1] = 5709 b[2][354][0] = 5710 
c    b[2][355][2] = 5711 b[2][355][1] = 5712 b[2][355][0] = 5713 
c    b[2][356][2] = 5714 b[2][356][1] = 5715 b[2][356][0] = 5716 
c    b[2][357][2] = 5717 b[2][357][1] = 5718 b[2][357][0] = 5719 
c    b[2][358][2] = 5720 b[2][358][1] = 5721 b[2][358][0] = 5722 
c    b[2][359][2] = 5723 b[2][359][1] = 5724 b[2][359][0] = 5725 
c    b[2][360][2] = 5726 b[2][360][1] = 5727 b[2][360][0] = 5728 
c    b[2][361][2] = 5729 b[2][361][1] = 5730 b[2][361][0] = 5731 
c    b[2][362][2] = 5732 b[2][362][1] = 5733 b[2][362][0] = 5734 
c    b[2][363][2] = 5735 b[2][363][1] = 5736 b[2][363][0] = 5737 
c    b[2][364][2] = 5738 b[2][364][1] = 5739 b[2][364][0] = 5740 
c    b[2][365][2] = 5741 b[2][365][1] = 5742 b[2][365][0] = 5743 
c    b[2][366][2] = 5744 b[2][366][1] = 5745 b[2][366][0] = 5746 
c    b[2][367][2] = 5747 b[2][367][1] = 5748 b[2][367][0] = 5749 
c    b[2][368][2] = 5750 b[2][368][1] = 5751 b[2][368][0] = 5752 
c    b[2][369][2] = 5753 b[2][369][1] = 5754 b[2][369][0] = 5755 
c    b[2][370][2] = 5756 b[2][370][1] = 5757 b[2][370][0] = 5758 
c    b[2][371][2] = 5759 b[2][371][1] = 5760 b[2][371][0] = 5761 
c    b[2][372][2] = 5762 b[2][372][1] = 5763 b[2][372][0] = 5764 
c    b[2][373][2] = 5765 b[2][373][1] = 5766 b[2][373][0] = 5767 
c    b[2][374][2] = 5768 b[2][374][1] = 5769 b[2][374][0] = 5770 
c    b[2][375][2] = 5771 b[2][375][1] = 5772 b[2][375][0] = 5773 
c    b[2][376][2] = 5774 b[2][376][1] = 5775 b[2][376][0] = 5776 
c    b[2][377][2] = 5777 b[2][377][1] = 5778 b[2][377][0] = 5779 
c    b[2][378][2] = 5780 b[2][378][1] = 5781 b[2][378][0] = 5782 
c    b[2][379][2] = 5783 b[2][379][1] = 5784 b[2][379][0] = 5785 
c    b[2][380][2] = 5786 b[2][380][1] = 5787 b[2][380][0] = 5788 
c    b[2][381][2] = 5789 b[2][381][1] = 5790 b[2][381][0] = 5791 
c    b[2][382][2] = 5792 b[2][382][1] = 5793 b[2][382][0] = 5794 
c    b[2][383][2] = 5795 b[2][383][1] = 5796 b[2][383][0] = 5797 
c    b[2][384][2] = 5798 b[2][384][1] = 5799 b[2][384][0] = 5800 
c    b[2][385][2] = 5801 b[2][385][1] = 5802 b[2][385][0] = 5803 
c    b[2][386][2] = 5804 b[2][386][1] = 5805 b[2][386][0] = 5806 
c    b[2][387][2] = 5807 b[2][387][1] = 5808 b[2][387][0] = 5809 
c    b[2][388][2] = 5810 b[2][388][1] = 5811 b[2][388][0] = 5812 
c    b[2][389][2] = 5813 b[2][389][1] = 5814 b[2][389][0] = 5815 
c    b[2][390][2] = 5816 b[2][390][1] = 5817 b[2][390][0] = 5818 
c    b[2][391][2] = 5819 b[2][391][1] = 5820 b[2][391][0] = 5821 
c    b[2][392][2] = 5822 b[2][392][1] = 5823 b[2][392][0] = 5824 
c    b[2][393][2] = 5825 b[2][393][1] = 5826 b[2][393][0] = 5827 
c    b[2][394][2] = 5828 b[2][394][1] = 5829 b[2][394][0] = 5830 
c    b[2][395][2] = 5831 b[2][395][1] = 5832 b[2][395][0] = 5833 
c    b[2][396][2] = 5834 b[2][396][1] = 5835 b[2][396][0] = 5836 
c    b[2][397][2] = 5837 b[2][397][1] = 5838 b[2][397][0] = 5839 
c    b[2][398][2] = 5840 b[2][398][1] = 5841 b[2][398][0] = 5842 
c    b[2][399][2] = 5843 b[2][399][1] = 5844 b[2][399][0] = 5845 
c    b[2][400][2] = 5846 b[2][400][1] = 5847 b[2][400][0] = 5848 
c    b[2][401][2] = 5849 b[2][401][1] = 5850 b[2][401][0] = 5851 
c    b[2][402][2] = 5852 b[2][402][1] = 5853 b[2][402][0] = 5854 
c    b[2][403][2] = 5855 b[2][403][1] = 5856 b[2][403][0] = 5857 
c    b[2][404][2] = 5858 b[2][404][1] = 5859 b[2][404][0] = 5860 
c    b[2][405][2] = 5861 b[2][405][1] = 5862 b[2][405][0] = 5863 
c    b[2][406][2] = 5864 b[2][406][1] = 5865 b[2][406][0] = 5866 
c    b[2][407][2] = 5867 b[2][407][1] = 5868 b[2][407][0] = 5869 
c    b[2][408][2] = 5870 b[2][408][1] = 5871 b[2][408][0] = 5872 
c    b[2][409][2] = 5873 b[2][409][1] = 5874 b[2][409][0] = 5875 
c    b[2][410][2] = 5876 b[2][410][1] = 5877 b[2][410][0] = 5878 
c    b[2][411][2] = 5879 b[2][411][1] = 5880 b[2][411][0] = 5881 
c    b[2][412][2] = 5882 b[2][412][1] = 5883 b[2][412][0] = 5884 
c    b[2][413][2] = 5885 b[2][413][1] = 5886 b[2][413][0] = 5887 
c    b[2][414][2] = 5888 b[2][414][1] = 5889 b[2][414][0] = 5890 
c    b[2][415][2] = 5891 b[2][415][1] = 5892 b[2][415][0] = 5893 
c    b[2][416][2] = 5894 b[2][416][1] = 5895 b[2][416][0] = 5896 
c    b[2][417][2] = 5897 b[2][417][1] = 5898 b[2][417][0] = 5899 
c    b[2][418][2] = 5900 b[2][418][1] = 5901 b[2][418][0] = 5902 
c    b[2][419][2] = 5903 b[2][419][1] = 5904 b[2][419][0] = 5905 
c    b[2][420][2] = 5906 b[2][420][1] = 5907 b[2][420][0] = 5908 
c    b[2][421][2] = 5909 b[2][421][1] = 5910 b[2][421][0] = 5911 
c    b[2][422][2] = 5912 b[2][422][1] = 5913 b[2][422][0] = 5914 
c    b[2][423][2] = 5915 b[2][423][1] = 5916 b[2][423][0] = 5917 
c    b[2][424][2] = 5918 b[2][424][1] = 5919 b[2][424][0] = 5920 
c    b[2][425][2] = 5921 b[2][425][1] = 5922 b[2][425][0] = 5923 
c    b[2][426][2] = 5924 b[2][426][1] = 5925 b[2][426][0] = 5926 
c    b[2][427][2] = 5927 b[2][427][1] = 5928 b[2][427][0] = 5929 
c    b[2][428][2] = 5930 b[2][428][1] = 5931 b[2][428][0] = 5932 
c    b[2][429][2] = 5933 b[2][429][1] = 5934 b[2][429][0] = 5935 
c    b[2][430][2] = 5936 b[2][430][1] = 5937 b[2][430][0] = 5938 
c    b[2][431][2] = 5939 b[2][431][1] = 5940 b[2][431][0] = 5941 
c    b[2][432][2] = 5942 b[2][432][1] = 5943 b[2][432][0] = 5944 
c    b[2][433][2] = 5945 b[2][433][1] = 5946 b[2][433][0] = 5947 
c    b[2][434][2] = 5948 b[2][434][1] = 5949 b[2][434][0] = 5950 
c    b[2][435][2] = 5951 b[2][435][1] = 5952 b[2][435][0] = 5953 
c    b[2][436][2] = 5954 b[2][436][1] = 5955 b[2][436][0] = 5956 
c    b[2][437][2] = 5957 b[2][437][1] = 5958 b[2][437][0] = 5959 
c    b[2][438][2] = 5960 b[2][438][1] = 5961 b[2][438][0] = 5962 
c    b[2][439][2] = 5963 b[2][439][1] = 5964 b[2][439][0] = 5965 
c    b[2][440][2] = 5966 b[2][440][1] = 5967 b[2][440][0] = 5968 
c    b[2][441][2] = 5969 b[2][441][1] = 5970 b[2][441][0] = 5971 
c    b[2][442][2] = 5972 b[2][442][1] = 5973 b[2][442][0] = 5974 
c    b[2][443][2] = 5975 b[2][443][1] = 5976 b[2][443][0] = 5977 
c    b[2][444][2] = 5978 b[2][444][1] = 5979 b[2][444][0] = 5980 
c    b[2][445][2] = 5981 b[2][445][1] = 5982 b[2][445][0] = 5983 
c    b[2][446][2] = 5984 b[2][446][1] = 5985 b[2][446][0] = 5986 
c    b[2][447][2] = 5987 b[2][447][1] = 5988 b[2][447][0] = 5989 
c    b[2][448][2] = 5990 b[2][448][1] = 5991 b[2][448][0] = 5992 
c    b[2][449][2] = 5993 b[2][449][1] = 5994 b[2][449][0] = 5995 
c    b[2][450][2] = 5996 b[2][450][1] = 5997 b[2][450][0] = 5998 
c    b[2][451][2] = 5999 b[2][451][1] = 6000 b[2][451][0] = 6001 
c    b[2][452][2] = 6002 b[2][452][1] = 6003 b[2][452][0] = 6004 
c    b[2][453][2] = 6005 b[2][453][1] = 6006 b[2][453][0] = 6007 
c    b[2][454][2] = 6008 b[2][454][1] = 6009 b[2][454][0] = 6010 
c    b[2][455][2] = 6011 b[2][455][1] = 6012 b[2][455][0] = 6013 
c    b[2][456][2] = 6014 b[2][456][1] = 6015 b[2][456][0] = 6016 
c    b[2][457][2] = 6017 b[2][457][1] = 6018 b[2][457][0] = 6019 
c    b[2][458][2] = 6020 b[2][458][1] = 6021 b[2][458][0] = 6022 
c    b[2][459][2] = 6023 b[2][459][1] = 6024 b[2][459][0] = 6025 
c    b[2][460][2] = 6026 b[2][460][1] = 6027 b[2][460][0] = 6028 
c    b[2][461][2] = 6029 b[2][461][1] = 6030 b[2][461][0] = 6031 
c    b[2][462][2] = 6032 b[2][462][1] = 6033 b[2][462][0] = 6034 
c    b[2][463][2] = 6035 b[2][463][1] = 6036 b[2][463][0] = 6037 
c    b[2][464][2] = 6038 b[2][464][1] = 6039 b[2][464][0] = 6040 
c    b[2][465][2] = 6041 b[2][465][1] = 6042 b[2][465][0] = 6043 
c    b[2][466][2] = 6044 b[2][466][1] = 6045 b[2][466][0] = 6046 
c    b[2][467][2] = 6047 b[2][467][1] = 6048 b[2][467][0] = 6049 
c    b[2][468][2] = 6050 b[2][468][1] = 6051 b[2][468][0] = 6052 
c    b[2][469][2] = 6053 b[2][469][1] = 6054 b[2][469][0] = 6055 
c    b[2][470][2] = 6056 b[2][470][1] = 6057 b[2][470][0] = 6058 
c    b[2][471][2] = 6059 b[2][471][1] = 6060 b[2][471][0] = 6061 
c    b[2][472][2] = 6062 b[2][472][1] = 6063 b[2][472][0] = 6064 
c    b[2][473][2] = 6065 b[2][473][1] = 6066 b[2][473][0] = 6067 
c    b[2][474][2] = 6068 b[2][474][1] = 6069 b[2][474][0] = 6070 
c    b[2][475][2] = 6071 b[2][475][1] = 6072 b[2][475][0] = 6073 
c    b[2][476][2] = 6074 b[2][476][1] = 6075 b[2][476][0] = 6076 
c    b[2][477][2] = 6077 b[2][477][1] = 6078 b[2][477][0] = 6079 
c    b[2][478][2] = 6080 b[2][478][1] = 6081 b[2][478][0] = 6082 
c    b[2][479][2] = 6083 b[2][479][1] = 6084 b[2][479][0] = 6085 
c    b[2][480][2] = 6086 b[2][480][1] = 6087 b[2][480][0] = 6088 
c    b[2][481][2] = 6089 b[2][481][1] = 6090 b[2][481][0] = 6091 
c    b[2][482][2] = 6092 b[2][482][1] = 6093 b[2][482][0] = 6094 
c    b[2][483][2] = 6095 b[2][483][1] = 6096 b[2][483][0] = 6097 
c    b[2][484][2] = 6098 b[2][484][1] = 6099 b[2][484][0] = 6100 
c    b[2][485][2] = 6101 b[2][485][1] = 6102 b[2][485][0] = 6103 
c    b[2][486][2] = 6104 b[2][486][1] = 6105 b[2][486][0] = 6106 
c    b[2][487][2] = 6107 b[2][487][1] = 6108 b[2][487][0] = 6109 
c    b[2][488][2] = 6110 b[2][488][1] = 6111 b[2][488][0] = 6112 
c    b[2][489][2] = 6113 b[2][489][1] = 6114 b[2][489][0] = 6115 
c    b[2][490][2] = 6116 b[2][490][1] = 6117 b[2][490][0] = 6118 
c    b[2][491][2] = 6119 b[2][491][1] = 6120 b[2][491][0] = 6121 
c    b[2][492][2] = 6122 b[2][492][1] = 6123 b[2][492][0] = 6124 
c    b[2][493][2] = 6125 b[2][493][1] = 6126 b[2][493][0] = 6127 
c    b[2][494][2] = 6128 b[2][494][1] = 6129 b[2][494][0] = 6130 
c    b[2][495][2] = 6131 b[2][495][1] = 6132 b[2][495][0] = 6133 
c    b[2][496][2] = 6134 b[2][496][1] = 6135 b[2][496][0] = 6136 
c    b[2][497][2] = 6137 b[2][497][1] = 6138 b[2][497][0] = 6139 
c    b[2][498][2] = 6140 b[2][498][1] = 6141 b[2][498][0] = 6142 
c    b[2][499][2] = 6143 b[2][499][1] = 6144 b[2][499][0] = 6145 
c    b[2][500][2] = 6146 b[2][500][1] = 6147 b[2][500][0] = 6148 
c    b[2][501][2] = 6149 b[2][501][1] = 6150 b[2][501][0] = 6151 
c    b[2][502][2] = 6152 b[2][502][1] = 6153 b[2][502][0] = 6154 
c    b[2][503][2] = 6155 b[2][503][1] = 6156 b[2][503][0] = 6157 
c    b[2][504][2] = 6158 b[2][504][1] = 6159 b[2][504][0] = 6160 
c    b[2][505][2] = 6161 b[2][505][1] = 6162 b[2][505][0] = 6163 
c    b[2][506][2] = 6164 b[2][506][1] = 6165 b[2][506][0] = 6166 
c    b[2][507][2] = 6167 b[2][507][1] = 6168 b[2][507][0] = 6169 
c    b[2][508][2] = 6170 b[2][508][1] = 6171 b[2][508][0] = 6172 
c    b[2][509][2] = 6173 b[2][509][1] = 6174 b[2][509][0] = 6175 
c    b[2][510][2] = 6176 b[2][510][1] = 6177 b[2][510][0] = 6178 
c    b[2][511][2] = 6179 b[2][511][1] = 6180 b[2][511][0] = 6181 
c    b[2][512][2] = 6182 b[2][512][1] = 6183 b[2][512][0] = 6184 
c    b[2][513][2] = 6185 b[2][513][1] = 6186 b[2][513][0] = 6187 
c    b[2][514][2] = 6188 b[2][514][1] = 6189 b[2][514][0] = 6190 
c    b[2][515][2] = 6191 b[2][515][1] = 6192 b[2][515][0] = 6193 
c    b[2][516][2] = 6194 b[2][516][1] = 6195 b[2][516][0] = 6196 
c    b[2][517][2] = 6197 b[2][517][1] = 6198 b[2][517][0] = 6199 
c    b[2][518][2] = 6200 b[2][518][1] = 6201 b[2][518][0] = 6202 
c    b[2][519][2] = 6203 b[2][519][1] = 6204 b[2][519][0] = 6205 
c    b[2][520][2] = 6206 b[2][520][1] = 6207 b[2][520][0] = 6208 
c    b[2][521][2] = 6209 b[2][521][1] = 6210 b[2][521][0] = 6211 
c    b[2][522][2] = 6212 b[2][522][1] = 6213 b[2][522][0] = 6214 
c    b[2][523][2] = 6215 b[2][523][1] = 6216 b[2][523][0] = 6217 
c    b[2][524][2] = 6218 b[2][524][1] = 6219 b[2][524][0] = 6220 
c    b[2][525][2] = 6221 b[2][525][1] = 6222 b[2][525][0] = 6223 
c    b[2][526][2] = 6224 b[2][526][1] = 6225 b[2][526][0] = 6226 
c    b[2][527][2] = 6227 b[2][527][1] = 6228 b[2][527][0] = 6229 
c    b[2][528][2] = 6230 b[2][528][1] = 6231 b[2][528][0] = 6232 
c    b[2][529][2] = 6233 b[2][529][1] = 6234 b[2][529][0] = 6235 
c    b[2][530][2] = 6236 b[2][530][1] = 6237 b[2][530][0] = 6238 
c    b[2][531][2] = 6239 b[2][531][1] = 6240 b[2][531][0] = 6241 
c    b[2][532][2] = 6242 b[2][532][1] = 6243 b[2][532][0] = 6244 
c    b[2][533][2] = 6245 b[2][533][1] = 6246 b[2][533][0] = 6247 
c    b[2][534][2] = 6248 b[2][534][1] = 6249 b[2][534][0] = 6250 
c    b[2][535][2] = 6251 b[2][535][1] = 6252 b[2][535][0] = 6253 
c    b[2][536][2] = 6254 b[2][536][1] = 6255 b[2][536][0] = 6256 
c    b[2][537][2] = 6257 b[2][537][1] = 6258 b[2][537][0] = 6259 
c    b[2][538][2] = 6260 b[2][538][1] = 6261 b[2][538][0] = 6262 
c    b[2][539][2] = 6263 b[2][539][1] = 6264 b[2][539][0] = 6265 
c    b[2][540][2] = 6266 b[2][540][1] = 6267 b[2][540][0] = 6268 
c    b[2][541][2] = 6269 b[2][541][1] = 6270 b[2][541][0] = 6271 
c    b[2][542][2] = 6272 b[2][542][1] = 6273 b[2][542][0] = 6274 
c    b[2][543][2] = 6275 b[2][543][1] = 6276 b[2][543][0] = 6277 
c    b[2][544][2] = 6278 b[2][544][1] = 6279 b[2][544][0] = 6280 
c    b[2][545][2] = 6281 b[2][545][1] = 6282 b[2][545][0] = 6283 
c    b[2][546][2] = 6284 b[2][546][1] = 6285 b[2][546][0] = 6286 
c    b[2][547][2] = 6287 b[2][547][1] = 6288 b[2][547][0] = 6289 
c    b[2][548][2] = 6290 b[2][548][1] = 6291 b[2][548][0] = 6292 
c    b[2][549][2] = 6293 b[2][549][1] = 6294 b[2][549][0] = 6295 
c    b[2][550][2] = 6296 b[2][550][1] = 6297 b[2][550][0] = 6298 
c    b[2][551][2] = 6299 b[2][551][1] = 6300 b[2][551][0] = 6301 
c    b[2][552][2] = 6302 b[2][552][1] = 6303 b[2][552][0] = 6304 
c    b[2][553][2] = 6305 b[2][553][1] = 6306 b[2][553][0] = 6307 
c    b[2][554][2] = 6308 b[2][554][1] = 6309 b[2][554][0] = 6310 
c    b[2][555][2] = 6311 b[2][555][1] = 6312 b[2][555][0] = 6313 
c    b[2][556][2] = 6314 b[2][556][1] = 6315 b[2][556][0] = 6316 
c    b[2][557][2] = 6317 b[2][557][1] = 6318 b[2][557][0] = 6319 
c    b[2][558][2] = 6320 b[2][558][1] = 6321 b[2][558][0] = 6322 
c    b[2][559][2] = 6323 b[2][559][1] = 6324 b[2][559][0] = 6325 
c    b[2][560][2] = 6326 b[2][560][1] = 6327 b[2][560][0] = 6328 
c    b[2][561][2] = 6329 b[2][561][1] = 6330 b[2][561][0] = 6331 
c    b[2][562][2] = 6332 b[2][562][1] = 6333 b[2][562][0] = 6334 
c    b[2][563][2] = 6335 b[2][563][1] = 6336 b[2][563][0] = 6337 
c    b[2][564][2] = 6338 b[2][564][1] = 6339 b[2][564][0] = 6340 
c    b[2][565][2] = 6341 b[2][565][1] = 6342 b[2][565][0] = 6343 
c    b[2][566][2] = 6344 b[2][566][1] = 6345 b[2][566][0] = 6346 
c    b[2][567][2] = 6347 b[2][567][1] = 6348 b[2][567][0] = 6349 
c    b[2][568][2] = 6350 b[2][568][1] = 6351 b[2][568][0] = 6352 
c    b[2][569][2] = 6353 b[2][569][1] = 6354 b[2][569][0] = 6355 
c    b[2][570][2] = 6356 b[2][570][1] = 6357 b[2][570][0] = 6358 
c    b[2][571][2] = 6359 b[2][571][1] = 6360 b[2][571][0] = 6361 
c    b[2][572][2] = 6362 b[2][572][1] = 6363 b[2][572][0] = 6364 
c    b[2][573][2] = 6365 b[2][573][1] = 6366 b[2][573][0] = 6367 
c    b[2][574][2] = 6368 b[2][574][1] = 6369 b[2][574][0] = 6370 
c    b[2][575][2] = 6371 b[2][575][1] = 6372 b[2][575][0] = 6373 
c    b[2][576][2] = 6374 b[2][576][1] = 6375 b[2][576][0] = 6376 
c    b[2][577][2] = 6377 b[2][577][1] = 6378 b[2][577][0] = 6379 
c    b[2][578][2] = 6380 b[2][578][1] = 6381 b[2][578][0] = 6382 
c    b[2][579][2] = 6383 b[2][579][1] = 6384 b[2][579][0] = 6385 
c    b[2][580][2] = 6386 b[2][580][1] = 6387 b[2][580][0] = 6388 
c    b[2][581][2] = 6389 b[2][581][1] = 6390 b[2][581][0] = 6391 

c    b[3][1][2] = 6392 b[3][1][1] = 6393 b[3][1][0] = 6394 
c    b[3][2][2] = 6395 b[3][2][1] = 6396 b[3][2][0] = 6397 
c    b[3][3][2] = 6398 b[3][3][1] = 6399 b[3][3][0] = 6400 
c    b[3][4][2] = 6401 b[3][4][1] = 6402 b[3][4][0] = 6403 
c    b[3][5][2] = 6404 b[3][5][1] = 6405 b[3][5][0] = 6406 
c    b[3][6][2] = 6407 b[3][6][1] = 6408 b[3][6][0] = 6409 
c    b[3][7][2] = 6410 b[3][7][1] = 6411 b[3][7][0] = 6412 
c    b[3][8][2] = 6413 b[3][8][1] = 6414 b[3][8][0] = 6415 
c    b[3][9][2] = 6416 b[3][9][1] = 6417 b[3][9][0] = 6418 
c    b[3][10][2] = 6419 b[3][10][1] = 6420 b[3][10][0] = 6421 
c    b[3][11][2] = 6422 b[3][11][1] = 6423 b[3][11][0] = 6424 
c    b[3][12][2] = 6425 b[3][12][1] = 6426 b[3][12][0] = 6427 
c    b[3][13][2] = 6428 b[3][13][1] = 6429 b[3][13][0] = 6430 
c    b[3][14][2] = 6431 b[3][14][1] = 6432 b[3][14][0] = 6433 
c    b[3][15][2] = 6434 b[3][15][1] = 6435 b[3][15][0] = 6436 
c    b[3][16][2] = 6437 b[3][16][1] = 6438 b[3][16][0] = 6439 
c    b[3][17][2] = 6440 b[3][17][1] = 6441 b[3][17][0] = 6442 
c    b[3][18][2] = 6443 b[3][18][1] = 6444 b[3][18][0] = 6445 
c    b[3][19][2] = 6446 b[3][19][1] = 6447 b[3][19][0] = 6448 
c    b[3][20][2] = 6449 b[3][20][1] = 6450 b[3][20][0] = 6451 
c    b[3][21][2] = 6452 b[3][21][1] = 6453 b[3][21][0] = 6454 
c    b[3][22][2] = 6455 b[3][22][1] = 6456 b[3][22][0] = 6457 
c    b[3][23][2] = 6458 b[3][23][1] = 6459 b[3][23][0] = 6460 
c    b[3][24][2] = 6461 b[3][24][1] = 6462 b[3][24][0] = 6463 
c    b[3][25][2] = 6464 b[3][25][1] = 6465 b[3][25][0] = 6466 
c    b[3][26][2] = 6467 b[3][26][1] = 6468 b[3][26][0] = 6469 
c    b[3][27][2] = 6470 b[3][27][1] = 6471 b[3][27][0] = 6472 
c    b[3][28][2] = 6473 b[3][28][1] = 6474 b[3][28][0] = 6475 
c    b[3][29][2] = 6476 b[3][29][1] = 6477 b[3][29][0] = 6478 
c    b[3][30][2] = 6479 b[3][30][1] = 6480 b[3][30][0] = 6481 
c    b[3][31][2] = 6482 b[3][31][1] = 6483 b[3][31][0] = 6484 
c    b[3][32][2] = 6485 b[3][32][1] = 6486 b[3][32][0] = 6487 
c    b[3][33][2] = 6488 b[3][33][1] = 6489 b[3][33][0] = 6490 
c    b[3][34][2] = 6491 b[3][34][1] = 6492 b[3][34][0] = 6493 
c    b[3][35][2] = 6494 b[3][35][1] = 6495 b[3][35][0] = 6496 
c    b[3][36][2] = 6497 b[3][36][1] = 6498 b[3][36][0] = 6499 
c    b[3][37][2] = 6500 b[3][37][1] = 6501 b[3][37][0] = 6502 
c    b[3][38][2] = 6503 b[3][38][1] = 6504 b[3][38][0] = 6505 
c    b[3][39][2] = 6506 b[3][39][1] = 6507 b[3][39][0] = 6508 
c    b[3][40][2] = 6509 b[3][40][1] = 6510 b[3][40][0] = 6511 
c    b[3][41][2] = 6512 b[3][41][1] = 6513 b[3][41][0] = 6514 
c    b[3][42][2] = 6515 b[3][42][1] = 6516 b[3][42][0] = 6517 
c    b[3][43][2] = 6518 b[3][43][1] = 6519 b[3][43][0] = 6520 
c    b[3][44][2] = 6521 b[3][44][1] = 6522 b[3][44][0] = 6523 
c    b[3][45][2] = 6524 b[3][45][1] = 6525 b[3][45][0] = 6526 
c    b[3][46][2] = 6527 b[3][46][1] = 6528 b[3][46][0] = 6529 
c    b[3][47][2] = 6530 b[3][47][1] = 6531 b[3][47][0] = 6532 
c    b[3][48][2] = 6533 b[3][48][1] = 6534 b[3][48][0] = 6535 
c    b[3][49][2] = 6536 b[3][49][1] = 6537 b[3][49][0] = 6538 
c    b[3][50][2] = 6539 b[3][50][1] = 6540 b[3][50][0] = 6541 
c    b[3][51][2] = 6542 b[3][51][1] = 6543 b[3][51][0] = 6544 
c    b[3][52][2] = 6545 b[3][52][1] = 6546 b[3][52][0] = 6547 
c    b[3][53][2] = 6548 b[3][53][1] = 6549 b[3][53][0] = 6550 
c    b[3][54][2] = 6551 b[3][54][1] = 6552 b[3][54][0] = 6553 
c    b[3][55][2] = 6554 b[3][55][1] = 6555 b[3][55][0] = 6556 
c    b[3][56][2] = 6557 b[3][56][1] = 6558 b[3][56][0] = 6559 
c    b[3][57][2] = 6560 b[3][57][1] = 6561 b[3][57][0] = 6562 
c    b[3][58][2] = 6563 b[3][58][1] = 6564 b[3][58][0] = 6565 
c    b[3][59][2] = 6566 b[3][59][1] = 6567 b[3][59][0] = 6568 
c    b[3][60][2] = 6569 b[3][60][1] = 6570 b[3][60][0] = 6571 
c    b[3][61][2] = 6572 b[3][61][1] = 6573 b[3][61][0] = 6574 
c    b[3][62][2] = 6575 b[3][62][1] = 6576 b[3][62][0] = 6577 
c    b[3][63][2] = 6578 b[3][63][1] = 6579 b[3][63][0] = 6580 
c    b[3][64][2] = 6581 b[3][64][1] = 6582 b[3][64][0] = 6583 
c    b[3][65][2] = 6584 b[3][65][1] = 6585 b[3][65][0] = 6586 
c    b[3][66][2] = 6587 b[3][66][1] = 6588 b[3][66][0] = 6589 
c    b[3][67][2] = 6590 b[3][67][1] = 6591 b[3][67][0] = 6592 
c    b[3][68][2] = 6593 b[3][68][1] = 6594 b[3][68][0] = 6595 
c    b[3][69][2] = 6596 b[3][69][1] = 6597 b[3][69][0] = 6598 
c    b[3][70][2] = 6599 b[3][70][1] = 6600 b[3][70][0] = 6601 
c    b[3][71][2] = 6602 b[3][71][1] = 6603 b[3][71][0] = 6604 
c    b[3][72][2] = 6605 b[3][72][1] = 6606 b[3][72][0] = 6607 
c    b[3][73][2] = 6608 b[3][73][1] = 6609 b[3][73][0] = 6610 
c    b[3][74][2] = 6611 b[3][74][1] = 6612 b[3][74][0] = 6613 
c    b[3][75][2] = 6614 b[3][75][1] = 6615 b[3][75][0] = 6616 
c    b[3][76][2] = 6617 b[3][76][1] = 6618 b[3][76][0] = 6619 
c    b[3][77][2] = 6620 b[3][77][1] = 6621 b[3][77][0] = 6622 
c    b[3][78][2] = 6623 b[3][78][1] = 6624 b[3][78][0] = 6625 
c    b[3][79][2] = 6626 b[3][79][1] = 6627 b[3][79][0] = 6628 
c    b[3][80][2] = 6629 b[3][80][1] = 6630 b[3][80][0] = 6631 
c    b[3][81][2] = 6632 b[3][81][1] = 6633 b[3][81][0] = 6634 
c    b[3][82][2] = 6635 b[3][82][1] = 6636 b[3][82][0] = 6637 
c    b[3][83][2] = 6638 b[3][83][1] = 6639 b[3][83][0] = 6640 
c    b[3][84][2] = 6641 b[3][84][1] = 6642 b[3][84][0] = 6643 
c    b[3][85][2] = 6644 b[3][85][1] = 6645 b[3][85][0] = 6646 
c    b[3][86][2] = 6647 b[3][86][1] = 6648 b[3][86][0] = 6649 
c    b[3][87][2] = 6650 b[3][87][1] = 6651 b[3][87][0] = 6652 
c    b[3][88][2] = 6653 b[3][88][1] = 6654 b[3][88][0] = 6655 
c    b[3][89][2] = 6656 b[3][89][1] = 6657 b[3][89][0] = 6658 
c    b[3][90][2] = 6659 b[3][90][1] = 6660 b[3][90][0] = 6661 
c    b[3][91][2] = 6662 b[3][91][1] = 6663 b[3][91][0] = 6664 
c    b[3][92][2] = 6665 b[3][92][1] = 6666 b[3][92][0] = 6667 
c    b[3][93][2] = 6668 b[3][93][1] = 6669 b[3][93][0] = 6670 
c    b[3][94][2] = 6671 b[3][94][1] = 6672 b[3][94][0] = 6673 
c    b[3][95][2] = 6674 b[3][95][1] = 6675 b[3][95][0] = 6676 
c    b[3][96][2] = 6677 b[3][96][1] = 6678 b[3][96][0] = 6679 
c    b[3][97][2] = 6680 b[3][97][1] = 6681 b[3][97][0] = 6682 
c    b[3][98][2] = 6683 b[3][98][1] = 6684 b[3][98][0] = 6685 
c    b[3][99][2] = 6686 b[3][99][1] = 6687 b[3][99][0] = 6688 
c    b[3][100][2] = 6689 b[3][100][1] = 6690 b[3][100][0] = 6691 
c    b[3][101][2] = 6692 b[3][101][1] = 6693 b[3][101][0] = 6694 
c    b[3][102][2] = 6695 b[3][102][1] = 6696 b[3][102][0] = 6697 
c    b[3][103][2] = 6698 b[3][103][1] = 6699 b[3][103][0] = 6700 
c    b[3][104][2] = 6701 b[3][104][1] = 6702 b[3][104][0] = 6703 
c    b[3][105][2] = 6704 b[3][105][1] = 6705 b[3][105][0] = 6706 
c    b[3][106][2] = 6707 b[3][106][1] = 6708 b[3][106][0] = 6709 
c    b[3][107][2] = 6710 b[3][107][1] = 6711 b[3][107][0] = 6712 
c    b[3][108][2] = 6713 b[3][108][1] = 6714 b[3][108][0] = 6715 
c    b[3][109][2] = 6716 b[3][109][1] = 6717 b[3][109][0] = 6718 
c    b[3][110][2] = 6719 b[3][110][1] = 6720 b[3][110][0] = 6721 
c    b[3][111][2] = 6722 b[3][111][1] = 6723 b[3][111][0] = 6724 
c    b[3][112][2] = 6725 b[3][112][1] = 6726 b[3][112][0] = 6727 
c    b[3][113][2] = 6728 b[3][113][1] = 6729 b[3][113][0] = 6730 
c    b[3][114][2] = 6731 b[3][114][1] = 6732 b[3][114][0] = 6733 
c    b[3][115][2] = 6734 b[3][115][1] = 6735 b[3][115][0] = 6736 
c    b[3][116][2] = 6737 b[3][116][1] = 6738 b[3][116][0] = 6739 
c    b[3][117][2] = 6740 b[3][117][1] = 6741 b[3][117][0] = 6742 
c    b[3][118][2] = 6743 b[3][118][1] = 6744 b[3][118][0] = 6745 
c    b[3][119][2] = 6746 b[3][119][1] = 6747 b[3][119][0] = 6748 
c    b[3][120][2] = 6749 b[3][120][1] = 6750 b[3][120][0] = 6751 
c    b[3][121][2] = 6752 b[3][121][1] = 6753 b[3][121][0] = 6754 
c    b[3][122][2] = 6755 b[3][122][1] = 6756 b[3][122][0] = 6757 
c    b[3][123][2] = 6758 b[3][123][1] = 6759 b[3][123][0] = 6760 
c    b[3][124][2] = 6761 b[3][124][1] = 6762 b[3][124][0] = 6763 
c    b[3][125][2] = 6764 b[3][125][1] = 6765 b[3][125][0] = 6766 
c    b[3][126][2] = 6767 b[3][126][1] = 6768 b[3][126][0] = 6769 
c    b[3][127][2] = 6770 b[3][127][1] = 6771 b[3][127][0] = 6772 
c    b[3][128][2] = 6773 b[3][128][1] = 6774 b[3][128][0] = 6775 
c    b[3][129][2] = 6776 b[3][129][1] = 6777 b[3][129][0] = 6778 
c    b[3][130][2] = 6779 b[3][130][1] = 6780 b[3][130][0] = 6781 
c    b[3][131][2] = 6782 b[3][131][1] = 6783 b[3][131][0] = 6784 
c    b[3][132][2] = 6785 b[3][132][1] = 6786 b[3][132][0] = 6787 
c    b[3][133][2] = 6788 b[3][133][1] = 6789 b[3][133][0] = 6790 
c    b[3][134][2] = 6791 b[3][134][1] = 6792 b[3][134][0] = 6793 
c    b[3][135][2] = 6794 b[3][135][1] = 6795 b[3][135][0] = 6796 
c    b[3][136][2] = 6797 b[3][136][1] = 6798 b[3][136][0] = 6799 
c    b[3][137][2] = 6800 b[3][137][1] = 6801 b[3][137][0] = 6802 
c    b[3][138][2] = 6803 b[3][138][1] = 6804 b[3][138][0] = 6805 
c    b[3][139][2] = 6806 b[3][139][1] = 6807 b[3][139][0] = 6808 
c    b[3][140][2] = 6809 b[3][140][1] = 6810 b[3][140][0] = 6811 
c    b[3][141][2] = 6812 b[3][141][1] = 6813 b[3][141][0] = 6814 
c    b[3][142][2] = 6815 b[3][142][1] = 6816 b[3][142][0] = 6817 
c    b[3][143][2] = 6818 b[3][143][1] = 6819 b[3][143][0] = 6820 
c    b[3][144][2] = 6821 b[3][144][1] = 6822 b[3][144][0] = 6823 
c    b[3][145][2] = 6824 b[3][145][1] = 6825 b[3][145][0] = 6826 
c    b[3][146][2] = 6827 b[3][146][1] = 6828 b[3][146][0] = 6829 
c    b[3][147][2] = 6830 b[3][147][1] = 6831 b[3][147][0] = 6832 
c    b[3][148][2] = 6833 b[3][148][1] = 6834 b[3][148][0] = 6835 
c    b[3][149][2] = 6836 b[3][149][1] = 6837 b[3][149][0] = 6838 
c    b[3][150][2] = 6839 b[3][150][1] = 6840 b[3][150][0] = 6841 
c    b[3][151][2] = 6842 b[3][151][1] = 6843 b[3][151][0] = 6844 
c    b[3][152][2] = 6845 b[3][152][1] = 6846 b[3][152][0] = 6847 
c    b[3][153][2] = 6848 b[3][153][1] = 6849 b[3][153][0] = 6850 
c    b[3][154][2] = 6851 b[3][154][1] = 6852 b[3][154][0] = 6853 
c    b[3][155][2] = 6854 b[3][155][1] = 6855 b[3][155][0] = 6856 
c    b[3][156][2] = 6857 b[3][156][1] = 6858 b[3][156][0] = 6859 
c    b[3][157][2] = 6860 b[3][157][1] = 6861 b[3][157][0] = 6862 
c    b[3][158][2] = 6863 b[3][158][1] = 6864 b[3][158][0] = 6865 
c    b[3][159][2] = 6866 b[3][159][1] = 6867 b[3][159][0] = 6868 
c    b[3][160][2] = 6869 b[3][160][1] = 6870 b[3][160][0] = 6871 
c    b[3][161][2] = 6872 b[3][161][1] = 6873 b[3][161][0] = 6874 
c    b[3][162][2] = 6875 b[3][162][1] = 6876 b[3][162][0] = 6877 
c    b[3][163][2] = 6878 b[3][163][1] = 6879 b[3][163][0] = 6880 
c    b[3][164][2] = 6881 b[3][164][1] = 6882 b[3][164][0] = 6883 
c    b[3][165][2] = 6884 b[3][165][1] = 6885 b[3][165][0] = 6886 
c    b[3][166][2] = 6887 b[3][166][1] = 6888 b[3][166][0] = 6889 
c    b[3][167][2] = 6890 b[3][167][1] = 6891 b[3][167][0] = 6892 
c    b[3][168][2] = 6893 b[3][168][1] = 6894 b[3][168][0] = 6895 
c    b[3][169][2] = 6896 b[3][169][1] = 6897 b[3][169][0] = 6898 
c    b[3][170][2] = 6899 b[3][170][1] = 6900 b[3][170][0] = 6901 
c    b[3][171][2] = 6902 b[3][171][1] = 6903 b[3][171][0] = 6904 
c    b[3][172][2] = 6905 b[3][172][1] = 6906 b[3][172][0] = 6907 
c    b[3][173][2] = 6908 b[3][173][1] = 6909 b[3][173][0] = 6910 
c    b[3][174][2] = 6911 b[3][174][1] = 6912 b[3][174][0] = 6913 
c    b[3][175][2] = 6914 b[3][175][1] = 6915 b[3][175][0] = 6916 
c    b[3][176][2] = 6917 b[3][176][1] = 6918 b[3][176][0] = 6919 
c    b[3][177][2] = 6920 b[3][177][1] = 6921 b[3][177][0] = 6922 
c    b[3][178][2] = 6923 b[3][178][1] = 6924 b[3][178][0] = 6925 
c    b[3][179][2] = 6926 b[3][179][1] = 6927 b[3][179][0] = 6928 
c    b[3][180][2] = 6929 b[3][180][1] = 6930 b[3][180][0] = 6931 
c    b[3][181][2] = 6932 b[3][181][1] = 6933 b[3][181][0] = 6934 
c    b[3][182][2] = 6935 b[3][182][1] = 6936 b[3][182][0] = 6937 
c    b[3][183][2] = 6938 b[3][183][1] = 6939 b[3][183][0] = 6940 
c    b[3][184][2] = 6941 b[3][184][1] = 6942 b[3][184][0] = 6943 
c    b[3][185][2] = 6944 b[3][185][1] = 6945 b[3][185][0] = 6946 
c    b[3][186][2] = 6947 b[3][186][1] = 6948 b[3][186][0] = 6949 
c    b[3][187][2] = 6950 b[3][187][1] = 6951 b[3][187][0] = 6952 
c    b[3][188][2] = 6953 b[3][188][1] = 6954 b[3][188][0] = 6955 
c    b[3][189][2] = 6956 b[3][189][1] = 6957 b[3][189][0] = 6958 
c    b[3][190][2] = 6959 b[3][190][1] = 6960 b[3][190][0] = 6961 
c    b[3][191][2] = 6962 b[3][191][1] = 6963 b[3][191][0] = 6964 
c    b[3][192][2] = 6965 b[3][192][1] = 6966 b[3][192][0] = 6967 
c    b[3][193][2] = 6968 b[3][193][1] = 6969 b[3][193][0] = 6970 
c    b[3][194][2] = 6971 b[3][194][1] = 6972 b[3][194][0] = 6973 
c    b[3][195][2] = 6974 b[3][195][1] = 6975 b[3][195][0] = 6976 
c    b[3][196][2] = 6977 b[3][196][1] = 6978 b[3][196][0] = 6979 
c    b[3][197][2] = 6980 b[3][197][1] = 6981 b[3][197][0] = 6982 
c    b[3][198][2] = 6983 b[3][198][1] = 6984 b[3][198][0] = 6985 
c    b[3][199][2] = 6986 b[3][199][1] = 6987 b[3][199][0] = 6988 
c    b[3][200][2] = 6989 b[3][200][1] = 6990 b[3][200][0] = 6991 
c    b[3][201][2] = 6992 b[3][201][1] = 6993 b[3][201][0] = 6994 
c    b[3][202][2] = 6995 b[3][202][1] = 6996 b[3][202][0] = 6997 
c    b[3][203][2] = 6998 b[3][203][1] = 6999 b[3][203][0] = 7000 
c    b[3][204][2] = 7001 b[3][204][1] = 7002 b[3][204][0] = 7003 
c    b[3][205][2] = 7004 b[3][205][1] = 7005 b[3][205][0] = 7006 
c    b[3][206][2] = 7007 b[3][206][1] = 7008 b[3][206][0] = 7009 
c    b[3][207][2] = 7010 b[3][207][1] = 7011 b[3][207][0] = 7012 
c    b[3][208][2] = 7013 b[3][208][1] = 7014 b[3][208][0] = 7015 
c    b[3][209][2] = 7016 b[3][209][1] = 7017 b[3][209][0] = 7018 
c    b[3][210][2] = 7019 b[3][210][1] = 7020 b[3][210][0] = 7021 
c    b[3][211][2] = 7022 b[3][211][1] = 7023 b[3][211][0] = 7024 
c    b[3][212][2] = 7025 b[3][212][1] = 7026 b[3][212][0] = 7027 
c    b[3][213][2] = 7028 b[3][213][1] = 7029 b[3][213][0] = 7030 
c    b[3][214][2] = 7031 b[3][214][1] = 7032 b[3][214][0] = 7033 
c    b[3][215][2] = 7034 b[3][215][1] = 7035 b[3][215][0] = 7036 
c    b[3][216][2] = 7037 b[3][216][1] = 7038 b[3][216][0] = 7039 
c    b[3][217][2] = 7040 b[3][217][1] = 7041 b[3][217][0] = 7042 
c    b[3][218][2] = 7043 b[3][218][1] = 7044 b[3][218][0] = 7045 
c    b[3][219][2] = 7046 b[3][219][1] = 7047 b[3][219][0] = 7048 
c    b[3][220][2] = 7049 b[3][220][1] = 7050 b[3][220][0] = 7051 
c    b[3][221][2] = 7052 b[3][221][1] = 7053 b[3][221][0] = 7054 
c    b[3][222][2] = 7055 b[3][222][1] = 7056 b[3][222][0] = 7057 
c    b[3][223][2] = 7058 b[3][223][1] = 7059 b[3][223][0] = 7060 
c    b[3][224][2] = 7061 b[3][224][1] = 7062 b[3][224][0] = 7063 
c    b[3][225][2] = 7064 b[3][225][1] = 7065 b[3][225][0] = 7066 
c    b[3][226][2] = 7067 b[3][226][1] = 7068 b[3][226][0] = 7069 
c    b[3][227][2] = 7070 b[3][227][1] = 7071 b[3][227][0] = 7072 
c    b[3][228][2] = 7073 b[3][228][1] = 7074 b[3][228][0] = 7075 
c    b[3][229][2] = 7076 b[3][229][1] = 7077 b[3][229][0] = 7078 
c    b[3][230][2] = 7079 b[3][230][1] = 7080 b[3][230][0] = 7081 
c    b[3][231][2] = 7082 b[3][231][1] = 7083 b[3][231][0] = 7084 
c    b[3][232][2] = 7085 b[3][232][1] = 7086 b[3][232][0] = 7087 
c    b[3][233][2] = 7088 b[3][233][1] = 7089 b[3][233][0] = 7090 
c    b[3][234][2] = 7091 b[3][234][1] = 7092 b[3][234][0] = 7093 
c    b[3][235][2] = 7094 b[3][235][1] = 7095 b[3][235][0] = 7096 
c    b[3][236][2] = 7097 b[3][236][1] = 7098 b[3][236][0] = 7099 
c    b[3][237][2] = 7100 b[3][237][1] = 7101 b[3][237][0] = 7102 
c    b[3][238][2] = 7103 b[3][238][1] = 7104 b[3][238][0] = 7105 
c    b[3][239][2] = 7106 b[3][239][1] = 7107 b[3][239][0] = 7108 
c    b[3][240][2] = 7109 b[3][240][1] = 7110 b[3][240][0] = 7111 
c    b[3][241][2] = 7112 b[3][241][1] = 7113 b[3][241][0] = 7114 
c    b[3][242][2] = 7115 b[3][242][1] = 7116 b[3][242][0] = 7117 
c    b[3][243][2] = 7118 b[3][243][1] = 7119 b[3][243][0] = 7120 
c    b[3][244][2] = 7121 b[3][244][1] = 7122 b[3][244][0] = 7123 
c    b[3][245][2] = 7124 b[3][245][1] = 7125 b[3][245][0] = 7126 
c    b[3][246][2] = 7127 b[3][246][1] = 7128 b[3][246][0] = 7129 
c    b[3][247][2] = 7130 b[3][247][1] = 7131 b[3][247][0] = 7132 
c    b[3][248][2] = 7133 b[3][248][1] = 7134 b[3][248][0] = 7135 
c    b[3][249][2] = 7136 b[3][249][1] = 7137 b[3][249][0] = 7138 
c    b[3][250][2] = 7139 b[3][250][1] = 7140 b[3][250][0] = 7141 
c    b[3][251][2] = 7142 b[3][251][1] = 7143 b[3][251][0] = 7144 
c    b[3][252][2] = 7145 b[3][252][1] = 7146 b[3][252][0] = 7147 
c    b[3][253][2] = 7148 b[3][253][1] = 7149 b[3][253][0] = 7150 
c    b[3][254][2] = 7151 b[3][254][1] = 7152 b[3][254][0] = 7153 
c    b[3][255][2] = 7154 b[3][255][1] = 7155 b[3][255][0] = 7156 
c    b[3][256][2] = 7157 b[3][256][1] = 7158 b[3][256][0] = 7159 
c    b[3][257][2] = 7160 b[3][257][1] = 7161 b[3][257][0] = 7162 
c    b[3][258][2] = 7163 b[3][258][1] = 7164 b[3][258][0] = 7165 
c    b[3][259][2] = 7166 b[3][259][1] = 7167 b[3][259][0] = 7168 
c    b[3][260][2] = 7169 b[3][260][1] = 7170 b[3][260][0] = 7171 
c    b[3][261][2] = 7172 b[3][261][1] = 7173 b[3][261][0] = 7174 
c    b[3][262][2] = 7175 b[3][262][1] = 7176 b[3][262][0] = 7177 
c    b[3][263][2] = 7178 b[3][263][1] = 7179 b[3][263][0] = 7180 
c    b[3][264][2] = 7181 b[3][264][1] = 7182 b[3][264][0] = 7183 
c    b[3][265][2] = 7184 b[3][265][1] = 7185 b[3][265][0] = 7186 
c    b[3][266][2] = 7187 b[3][266][1] = 7188 b[3][266][0] = 7189 
c    b[3][267][2] = 7190 b[3][267][1] = 7191 b[3][267][0] = 7192 
c    b[3][268][2] = 7193 b[3][268][1] = 7194 b[3][268][0] = 7195 
c    b[3][269][2] = 7196 b[3][269][1] = 7197 b[3][269][0] = 7198 
c    b[3][270][2] = 7199 b[3][270][1] = 7200 b[3][270][0] = 7201 
c    b[3][271][2] = 7202 b[3][271][1] = 7203 b[3][271][0] = 7204 
c    b[3][272][2] = 7205 b[3][272][1] = 7206 b[3][272][0] = 7207 
c    b[3][273][2] = 7208 b[3][273][1] = 7209 b[3][273][0] = 7210 
c    b[3][274][2] = 7211 b[3][274][1] = 7212 b[3][274][0] = 7213 
c    b[3][275][2] = 7214 b[3][275][1] = 7215 b[3][275][0] = 7216 
c    b[3][276][2] = 7217 b[3][276][1] = 7218 b[3][276][0] = 7219 
c    b[3][277][2] = 7220 b[3][277][1] = 7221 b[3][277][0] = 7222 
c    b[3][278][2] = 7223 b[3][278][1] = 7224 b[3][278][0] = 7225 
c    b[3][279][2] = 7226 b[3][279][1] = 7227 b[3][279][0] = 7228 
c    b[3][280][2] = 7229 b[3][280][1] = 7230 b[3][280][0] = 7231 
c    b[3][281][2] = 7232 b[3][281][1] = 7233 b[3][281][0] = 7234 
c    b[3][282][2] = 7235 b[3][282][1] = 7236 b[3][282][0] = 7237 
c    b[3][283][2] = 7238 b[3][283][1] = 7239 b[3][283][0] = 7240 
c    b[3][284][2] = 7241 b[3][284][1] = 7242 b[3][284][0] = 7243 
c    b[3][285][2] = 7244 b[3][285][1] = 7245 b[3][285][0] = 7246 
c    b[3][286][2] = 7247 b[3][286][1] = 7248 b[3][286][0] = 7249 
c    b[3][287][2] = 7250 b[3][287][1] = 7251 b[3][287][0] = 7252 
c    b[3][288][2] = 7253 b[3][288][1] = 7254 b[3][288][0] = 7255 
c    b[3][289][2] = 7256 b[3][289][1] = 7257 b[3][289][0] = 7258 
c    b[3][290][2] = 7259 b[3][290][1] = 7260 b[3][290][0] = 7261 
c    b[3][291][2] = 7262 b[3][291][1] = 7263 b[3][291][0] = 7264 
c    b[3][292][2] = 7265 b[3][292][1] = 7266 b[3][292][0] = 7267 
c    b[3][293][2] = 7268 b[3][293][1] = 7269 b[3][293][0] = 7270 
c    b[3][294][2] = 7271 b[3][294][1] = 7272 b[3][294][0] = 7273 
c    b[3][295][2] = 7274 b[3][295][1] = 7275 b[3][295][0] = 7276 
c    b[3][296][2] = 7277 b[3][296][1] = 7278 b[3][296][0] = 7279 
c    b[3][297][2] = 7280 b[3][297][1] = 7281 b[3][297][0] = 7282 
c    b[3][298][2] = 7283 b[3][298][1] = 7284 b[3][298][0] = 7285 
c    b[3][299][2] = 7286 b[3][299][1] = 7287 b[3][299][0] = 7288 
c    b[3][300][2] = 7289 b[3][300][1] = 7290 b[3][300][0] = 7291 
c    b[3][301][2] = 7292 b[3][301][1] = 7293 b[3][301][0] = 7294 
c    b[3][302][2] = 7295 b[3][302][1] = 7296 b[3][302][0] = 7297 
c    b[3][303][2] = 7298 b[3][303][1] = 7299 b[3][303][0] = 7300 
c    b[3][304][2] = 7301 b[3][304][1] = 7302 b[3][304][0] = 7303 
c    b[3][305][2] = 7304 b[3][305][1] = 7305 b[3][305][0] = 7306 
c    b[3][306][2] = 7307 b[3][306][1] = 7308 b[3][306][0] = 7309 
c    b[3][307][2] = 7310 b[3][307][1] = 7311 b[3][307][0] = 7312 
c    b[3][308][2] = 7313 b[3][308][1] = 7314 b[3][308][0] = 7315 
c    b[3][309][2] = 7316 b[3][309][1] = 7317 b[3][309][0] = 7318 
c    b[3][310][2] = 7319 b[3][310][1] = 7320 b[3][310][0] = 7321 
c    b[3][311][2] = 7322 b[3][311][1] = 7323 b[3][311][0] = 7324 
c    b[3][312][2] = 7325 b[3][312][1] = 7326 b[3][312][0] = 7327 
c    b[3][313][2] = 7328 b[3][313][1] = 7329 b[3][313][0] = 7330 
c    b[3][314][2] = 7331 b[3][314][1] = 7332 b[3][314][0] = 7333 
c    b[3][315][2] = 7334 b[3][315][1] = 7335 b[3][315][0] = 7336 
c    b[3][316][2] = 7337 b[3][316][1] = 7338 b[3][316][0] = 7339 
c    b[3][317][2] = 7340 b[3][317][1] = 7341 b[3][317][0] = 7342 
c    b[3][318][2] = 7343 b[3][318][1] = 7344 b[3][318][0] = 7345 
c    b[3][319][2] = 7346 b[3][319][1] = 7347 b[3][319][0] = 7348 
c    b[3][320][2] = 7349 b[3][320][1] = 7350 b[3][320][0] = 7351 
c    b[3][321][2] = 7352 b[3][321][1] = 7353 b[3][321][0] = 7354 
c    b[3][322][2] = 7355 b[3][322][1] = 7356 b[3][322][0] = 7357 
c    b[3][323][2] = 7358 b[3][323][1] = 7359 b[3][323][0] = 7360 
c    b[3][324][2] = 7361 b[3][324][1] = 7362 b[3][324][0] = 7363 
c    b[3][325][2] = 7364 b[3][325][1] = 7365 b[3][325][0] = 7366 
c    b[3][326][2] = 7367 b[3][326][1] = 7368 b[3][326][0] = 7369 
c    b[3][327][2] = 7370 b[3][327][1] = 7371 b[3][327][0] = 7372 
c    b[3][328][2] = 7373 b[3][328][1] = 7374 b[3][328][0] = 7375 
c    b[3][329][2] = 7376 b[3][329][1] = 7377 b[3][329][0] = 7378 
c    b[3][330][2] = 7379 b[3][330][1] = 7380 b[3][330][0] = 7381 
c    b[3][331][2] = 7382 b[3][331][1] = 7383 b[3][331][0] = 7384 
c    b[3][332][2] = 7385 b[3][332][1] = 7386 b[3][332][0] = 7387 
c    b[3][333][2] = 7388 b[3][333][1] = 7389 b[3][333][0] = 7390 
c    b[3][334][2] = 7391 b[3][334][1] = 7392 b[3][334][0] = 7393 
c    b[3][335][2] = 7394 b[3][335][1] = 7395 b[3][335][0] = 7396 
c    b[3][336][2] = 7397 b[3][336][1] = 7398 b[3][336][0] = 7399 
c    b[3][337][2] = 7400 b[3][337][1] = 7401 b[3][337][0] = 7402 
c    b[3][338][2] = 7403 b[3][338][1] = 7404 b[3][338][0] = 7405 
c    b[3][339][2] = 7406 b[3][339][1] = 7407 b[3][339][0] = 7408 
c    b[3][340][2] = 7409 b[3][340][1] = 7410 b[3][340][0] = 7411 
c    b[3][341][2] = 7412 b[3][341][1] = 7413 b[3][341][0] = 7414 
c    b[3][342][2] = 7415 b[3][342][1] = 7416 b[3][342][0] = 7417 
c    b[3][343][2] = 7418 b[3][343][1] = 7419 b[3][343][0] = 7420 
c    b[3][344][2] = 7421 b[3][344][1] = 7422 b[3][344][0] = 7423 
c    b[3][345][2] = 7424 b[3][345][1] = 7425 b[3][345][0] = 7426 
c    b[3][346][2] = 7427 b[3][346][1] = 7428 b[3][346][0] = 7429 
c    b[3][347][2] = 7430 b[3][347][1] = 7431 b[3][347][0] = 7432 
c    b[3][348][2] = 7433 b[3][348][1] = 7434 b[3][348][0] = 7435 
c    b[3][349][2] = 7436 b[3][349][1] = 7437 b[3][349][0] = 7438 
c    b[3][350][2] = 7439 b[3][350][1] = 7440 b[3][350][0] = 7441 
c    b[3][351][2] = 7442 b[3][351][1] = 7443 b[3][351][0] = 7444 
c    b[3][352][2] = 7445 b[3][352][1] = 7446 b[3][352][0] = 7447 
c    b[3][353][2] = 7448 b[3][353][1] = 7449 b[3][353][0] = 7450 
c    b[3][354][2] = 7451 b[3][354][1] = 7452 b[3][354][0] = 7453 
c    b[3][355][2] = 7454 b[3][355][1] = 7455 b[3][355][0] = 7456 
c    b[3][356][2] = 7457 b[3][356][1] = 7458 b[3][356][0] = 7459 
c    b[3][357][2] = 7460 b[3][357][1] = 7461 b[3][357][0] = 7462 
c    b[3][358][2] = 7463 b[3][358][1] = 7464 b[3][358][0] = 7465 
c    b[3][359][2] = 7466 b[3][359][1] = 7467 b[3][359][0] = 7468 
c    b[3][360][2] = 7469 b[3][360][1] = 7470 b[3][360][0] = 7471 
c    b[3][361][2] = 7472 b[3][361][1] = 7473 b[3][361][0] = 7474 
c    b[3][362][2] = 7475 b[3][362][1] = 7476 b[3][362][0] = 7477 
c    b[3][363][2] = 7478 b[3][363][1] = 7479 b[3][363][0] = 7480 
c    b[3][364][2] = 7481 b[3][364][1] = 7482 b[3][364][0] = 7483 
c    b[3][365][2] = 7484 b[3][365][1] = 7485 b[3][365][0] = 7486 
c    b[3][366][2] = 7487 b[3][366][1] = 7488 b[3][366][0] = 7489 
c    b[3][367][2] = 7490 b[3][367][1] = 7491 b[3][367][0] = 7492 
c    b[3][368][2] = 7493 b[3][368][1] = 7494 b[3][368][0] = 7495 
c    b[3][369][2] = 7496 b[3][369][1] = 7497 b[3][369][0] = 7498 
c    b[3][370][2] = 7499 b[3][370][1] = 7500 b[3][370][0] = 7501 
c    b[3][371][2] = 7502 b[3][371][1] = 7503 b[3][371][0] = 7504 
c    b[3][372][2] = 7505 b[3][372][1] = 7506 b[3][372][0] = 7507 
c    b[3][373][2] = 7508 b[3][373][1] = 7509 b[3][373][0] = 7510 
c    b[3][374][2] = 7511 b[3][374][1] = 7512 b[3][374][0] = 7513 
c    b[3][375][2] = 7514 b[3][375][1] = 7515 b[3][375][0] = 7516 
c    b[3][376][2] = 7517 b[3][376][1] = 7518 b[3][376][0] = 7519 
c    b[3][377][2] = 7520 b[3][377][1] = 7521 b[3][377][0] = 7522 
c    b[3][378][2] = 7523 b[3][378][1] = 7524 b[3][378][0] = 7525 
c    b[3][379][2] = 7526 b[3][379][1] = 7527 b[3][379][0] = 7528 
c    b[3][380][2] = 7529 b[3][380][1] = 7530 b[3][380][0] = 7531 
c    b[3][381][2] = 7532 b[3][381][1] = 7533 b[3][381][0] = 7534 
c    b[3][382][2] = 7535 b[3][382][1] = 7536 b[3][382][0] = 7537 
c    b[3][383][2] = 7538 b[3][383][1] = 7539 b[3][383][0] = 7540 
c    b[3][384][2] = 7541 b[3][384][1] = 7542 b[3][384][0] = 7543 
c    b[3][385][2] = 7544 b[3][385][1] = 7545 b[3][385][0] = 7546 
c    b[3][386][2] = 7547 b[3][386][1] = 7548 b[3][386][0] = 7549 
c    b[3][387][2] = 7550 b[3][387][1] = 7551 b[3][387][0] = 7552 
c    b[3][388][2] = 7553 b[3][388][1] = 7554 b[3][388][0] = 7555 

c    b[4][1][2] = 7556 b[4][1][1] = 7557 b[4][1][0] = 7558 
c    b[4][2][2] = 7559 b[4][2][1] = 7560 b[4][2][0] = 7561 
c    b[4][3][2] = 7562 b[4][3][1] = 7563 b[4][3][0] = 7564 
c    b[4][4][2] = 7565 b[4][4][1] = 7566 b[4][4][0] = 7567 
c    b[4][5][2] = 7568 b[4][5][1] = 7569 b[4][5][0] = 7570 
c    b[4][6][2] = 7571 b[4][6][1] = 7572 b[4][6][0] = 7573 
c    b[4][7][2] = 7574 b[4][7][1] = 7575 b[4][7][0] = 7576 
c    b[4][8][2] = 7577 b[4][8][1] = 7578 b[4][8][0] = 7579 
c    b[4][9][2] = 7580 b[4][9][1] = 7581 b[4][9][0] = 7582 
c    b[4][10][2] = 7583 b[4][10][1] = 7584 b[4][10][0] = 7585 
c    b[4][11][2] = 7586 b[4][11][1] = 7587 b[4][11][0] = 7588 
c    b[4][12][2] = 7589 b[4][12][1] = 7590 b[4][12][0] = 7591 
c    b[4][13][2] = 7592 b[4][13][1] = 7593 b[4][13][0] = 7594 
c    b[4][14][2] = 7595 b[4][14][1] = 7596 b[4][14][0] = 7597 
c    b[4][15][2] = 7598 b[4][15][1] = 7599 b[4][15][0] = 7600 
c    b[4][16][2] = 7601 b[4][16][1] = 7602 b[4][16][0] = 7603 
c    b[4][17][2] = 7604 b[4][17][1] = 7605 b[4][17][0] = 7606 
c    b[4][18][2] = 7607 b[4][18][1] = 7608 b[4][18][0] = 7609 
c    b[4][19][2] = 7610 b[4][19][1] = 7611 b[4][19][0] = 7612 
c    b[4][20][2] = 7613 b[4][20][1] = 7614 b[4][20][0] = 7615 
c    b[4][21][2] = 7616 b[4][21][1] = 7617 b[4][21][0] = 7618 
c    b[4][22][2] = 7619 b[4][22][1] = 7620 b[4][22][0] = 7621 
c    b[4][23][2] = 7622 b[4][23][1] = 7623 b[4][23][0] = 7624 
c    b[4][24][2] = 7625 b[4][24][1] = 7626 b[4][24][0] = 7627 
c    b[4][25][2] = 7628 b[4][25][1] = 7629 b[4][25][0] = 7630 
c    b[4][26][2] = 7631 b[4][26][1] = 7632 b[4][26][0] = 7633 
c    b[4][27][2] = 7634 b[4][27][1] = 7635 b[4][27][0] = 7636 
c    b[4][28][2] = 7637 b[4][28][1] = 7638 b[4][28][0] = 7639 
c    b[4][29][2] = 7640 b[4][29][1] = 7641 b[4][29][0] = 7642 
c    b[4][30][2] = 7643 b[4][30][1] = 7644 b[4][30][0] = 7645 
c    b[4][31][2] = 7646 b[4][31][1] = 7647 b[4][31][0] = 7648 
c    b[4][32][2] = 7649 b[4][32][1] = 7650 b[4][32][0] = 7651 
c    b[4][33][2] = 7652 b[4][33][1] = 7653 b[4][33][0] = 7654 
c    b[4][34][2] = 7655 b[4][34][1] = 7656 b[4][34][0] = 7657 
c    b[4][35][2] = 7658 b[4][35][1] = 7659 b[4][35][0] = 7660 
c    b[4][36][2] = 7661 b[4][36][1] = 7662 b[4][36][0] = 7663 
c    b[4][37][2] = 7664 b[4][37][1] = 7665 b[4][37][0] = 7666 
c    b[4][38][2] = 7667 b[4][38][1] = 7668 b[4][38][0] = 7669 
c    b[4][39][2] = 7670 b[4][39][1] = 7671 b[4][39][0] = 7672 
c    b[4][40][2] = 7673 b[4][40][1] = 7674 b[4][40][0] = 7675 
c    b[4][41][2] = 7676 b[4][41][1] = 7677 b[4][41][0] = 7678 
c    b[4][42][2] = 7679 b[4][42][1] = 7680 b[4][42][0] = 7681 
c    b[4][43][2] = 7682 b[4][43][1] = 7683 b[4][43][0] = 7684 
c    b[4][44][2] = 7685 b[4][44][1] = 7686 b[4][44][0] = 7687 
c    b[4][45][2] = 7688 b[4][45][1] = 7689 b[4][45][0] = 7690 
c    b[4][46][2] = 7691 b[4][46][1] = 7692 b[4][46][0] = 7693 
c    b[4][47][2] = 7694 b[4][47][1] = 7695 b[4][47][0] = 7696 
c    b[4][48][2] = 7697 b[4][48][1] = 7698 b[4][48][0] = 7699 
c    b[4][49][2] = 7700 b[4][49][1] = 7701 b[4][49][0] = 7702 
c    b[4][50][2] = 7703 b[4][50][1] = 7704 b[4][50][0] = 7705 
c    b[4][51][2] = 7706 b[4][51][1] = 7707 b[4][51][0] = 7708 
c    b[4][52][2] = 7709 b[4][52][1] = 7710 b[4][52][0] = 7711 
c    b[4][53][2] = 7712 b[4][53][1] = 7713 b[4][53][0] = 7714 
c    b[4][54][2] = 7715 b[4][54][1] = 7716 b[4][54][0] = 7717 
c    b[4][55][2] = 7718 b[4][55][1] = 7719 b[4][55][0] = 7720 
c    b[4][56][2] = 7721 b[4][56][1] = 7722 b[4][56][0] = 7723 
c    b[4][57][2] = 7724 b[4][57][1] = 7725 b[4][57][0] = 7726 
c    b[4][58][2] = 7727 b[4][58][1] = 7728 b[4][58][0] = 7729 
c    b[4][59][2] = 7730 b[4][59][1] = 7731 b[4][59][0] = 7732 
c    b[4][60][2] = 7733 b[4][60][1] = 7734 b[4][60][0] = 7735 
c    b[4][61][2] = 7736 b[4][61][1] = 7737 b[4][61][0] = 7738 
c    b[4][62][2] = 7739 b[4][62][1] = 7740 b[4][62][0] = 7741 
c    b[4][63][2] = 7742 b[4][63][1] = 7743 b[4][63][0] = 7744 
c    b[4][64][2] = 7745 b[4][64][1] = 7746 b[4][64][0] = 7747 
c    b[4][65][2] = 7748 b[4][65][1] = 7749 b[4][65][0] = 7750 
c    b[4][66][2] = 7751 b[4][66][1] = 7752 b[4][66][0] = 7753 
c    b[4][67][2] = 7754 b[4][67][1] = 7755 b[4][67][0] = 7756 
c    b[4][68][2] = 7757 b[4][68][1] = 7758 b[4][68][0] = 7759 
c    b[4][69][2] = 7760 b[4][69][1] = 7761 b[4][69][0] = 7762 
c    b[4][70][2] = 7763 b[4][70][1] = 7764 b[4][70][0] = 7765 
c    b[4][71][2] = 7766 b[4][71][1] = 7767 b[4][71][0] = 7768 
c    b[4][72][2] = 7769 b[4][72][1] = 7770 b[4][72][0] = 7771 
c    b[4][73][2] = 7772 b[4][73][1] = 7773 b[4][73][0] = 7774 
c    b[4][74][2] = 7775 b[4][74][1] = 7776 b[4][74][0] = 7777 
c    b[4][75][2] = 7778 b[4][75][1] = 7779 b[4][75][0] = 7780 
c    b[4][76][2] = 7781 b[4][76][1] = 7782 b[4][76][0] = 7783 
c    b[4][77][2] = 7784 b[4][77][1] = 7785 b[4][77][0] = 7786 
c    b[4][78][2] = 7787 b[4][78][1] = 7788 b[4][78][0] = 7789 
c    b[4][79][2] = 7790 b[4][79][1] = 7791 b[4][79][0] = 7792 
c    b[4][80][2] = 7793 b[4][80][1] = 7794 b[4][80][0] = 7795 
c    b[4][81][2] = 7796 b[4][81][1] = 7797 b[4][81][0] = 7798 
c    b[4][82][2] = 7799 b[4][82][1] = 7800 b[4][82][0] = 7801 
c    b[4][83][2] = 7802 b[4][83][1] = 7803 b[4][83][0] = 7804 
c    b[4][84][2] = 7805 b[4][84][1] = 7806 b[4][84][0] = 7807 
c    b[4][85][2] = 7808 b[4][85][1] = 7809 b[4][85][0] = 7810 
c    b[4][86][2] = 7811 b[4][86][1] = 7812 b[4][86][0] = 7813 
c    b[4][87][2] = 7814 b[4][87][1] = 7815 b[4][87][0] = 7816 
c    b[4][88][2] = 7817 b[4][88][1] = 7818 b[4][88][0] = 7819 
c    b[4][89][2] = 7820 b[4][89][1] = 7821 b[4][89][0] = 7822 
c    b[4][90][2] = 7823 b[4][90][1] = 7824 b[4][90][0] = 7825 
c    b[4][91][2] = 7826 b[4][91][1] = 7827 b[4][91][0] = 7828 
c    b[4][92][2] = 7829 b[4][92][1] = 7830 b[4][92][0] = 7831 
c    b[4][93][2] = 7832 b[4][93][1] = 7833 b[4][93][0] = 7834 
c    b[4][94][2] = 7835 b[4][94][1] = 7836 b[4][94][0] = 7837 
c    b[4][95][2] = 7838 b[4][95][1] = 7839 b[4][95][0] = 7840 
c    b[4][96][2] = 7841 b[4][96][1] = 7842 b[4][96][0] = 7843 
c    b[4][97][2] = 7844 b[4][97][1] = 7845 b[4][97][0] = 7846 
c    b[4][98][2] = 7847 b[4][98][1] = 7848 b[4][98][0] = 7849 
c    b[4][99][2] = 7850 b[4][99][1] = 7851 b[4][99][0] = 7852 
c    b[4][100][2] = 7853 b[4][100][1] = 7854 b[4][100][0] = 7855 
c    b[4][101][2] = 7856 b[4][101][1] = 7857 b[4][101][0] = 7858 
c    b[4][102][2] = 7859 b[4][102][1] = 7860 b[4][102][0] = 7861 
c    b[4][103][2] = 7862 b[4][103][1] = 7863 b[4][103][0] = 7864 
c    b[4][104][2] = 7865 b[4][104][1] = 7866 b[4][104][0] = 7867 
c    b[4][105][2] = 7868 b[4][105][1] = 7869 b[4][105][0] = 7870 
c    b[4][106][2] = 7871 b[4][106][1] = 7872 b[4][106][0] = 7873 
c    b[4][107][2] = 7874 b[4][107][1] = 7875 b[4][107][0] = 7876 
c    b[4][108][2] = 7877 b[4][108][1] = 7878 b[4][108][0] = 7879 
c    b[4][109][2] = 7880 b[4][109][1] = 7881 b[4][109][0] = 7882 
c    b[4][110][2] = 7883 b[4][110][1] = 7884 b[4][110][0] = 7885 
c    b[4][111][2] = 7886 b[4][111][1] = 7887 b[4][111][0] = 7888 
c    b[4][112][2] = 7889 b[4][112][1] = 7890 b[4][112][0] = 7891 
c    b[4][113][2] = 7892 b[4][113][1] = 7893 b[4][113][0] = 7894 
c    b[4][114][2] = 7895 b[4][114][1] = 7896 b[4][114][0] = 7897 
c    b[4][115][2] = 7898 b[4][115][1] = 7899 b[4][115][0] = 7900 
c    b[4][116][2] = 7901 b[4][116][1] = 7902 b[4][116][0] = 7903 
c    b[4][117][2] = 7904 b[4][117][1] = 7905 b[4][117][0] = 7906 
c    b[4][118][2] = 7907 b[4][118][1] = 7908 b[4][118][0] = 7909 
c    b[4][119][2] = 7910 b[4][119][1] = 7911 b[4][119][0] = 7912 
c    b[4][120][2] = 7913 b[4][120][1] = 7914 b[4][120][0] = 7915 
c    b[4][121][2] = 7916 b[4][121][1] = 7917 b[4][121][0] = 7918 
c    b[4][122][2] = 7919 b[4][122][1] = 7920 b[4][122][0] = 7921 
c    b[4][123][2] = 7922 b[4][123][1] = 7923 b[4][123][0] = 7924 
c    b[4][124][2] = 7925 b[4][124][1] = 7926 b[4][124][0] = 7927 
c    b[4][125][2] = 7928 b[4][125][1] = 7929 b[4][125][0] = 7930 
c    b[4][126][2] = 7931 b[4][126][1] = 7932 b[4][126][0] = 7933 
c    b[4][127][2] = 7934 b[4][127][1] = 7935 b[4][127][0] = 7936 
c    b[4][128][2] = 7937 b[4][128][1] = 7938 b[4][128][0] = 7939 
c    b[4][129][2] = 7940 b[4][129][1] = 7941 b[4][129][0] = 7942 
c    b[4][130][2] = 7943 b[4][130][1] = 7944 b[4][130][0] = 7945 
c    b[4][131][2] = 7946 b[4][131][1] = 7947 b[4][131][0] = 7948 
c    b[4][132][2] = 7949 b[4][132][1] = 7950 b[4][132][0] = 7951 
c    b[4][133][2] = 7952 b[4][133][1] = 7953 b[4][133][0] = 7954 
c    b[4][134][2] = 7955 b[4][134][1] = 7956 b[4][134][0] = 7957 
c    b[4][135][2] = 7958 b[4][135][1] = 7959 b[4][135][0] = 7960 
c    b[4][136][2] = 7961 b[4][136][1] = 7962 b[4][136][0] = 7963 
c    b[4][137][2] = 7964 b[4][137][1] = 7965 b[4][137][0] = 7966 
c    b[4][138][2] = 7967 b[4][138][1] = 7968 b[4][138][0] = 7969 
c    b[4][139][2] = 7970 b[4][139][1] = 7971 b[4][139][0] = 7972 
c    b[4][140][2] = 7973 b[4][140][1] = 7974 b[4][140][0] = 7975 
c    b[4][141][2] = 7976 b[4][141][1] = 7977 b[4][141][0] = 7978 
c    b[4][142][2] = 7979 b[4][142][1] = 7980 b[4][142][0] = 7981 
c    b[4][143][2] = 7982 b[4][143][1] = 7983 b[4][143][0] = 7984 
c    b[4][144][2] = 7985 b[4][144][1] = 7986 b[4][144][0] = 7987 
c    b[4][145][2] = 7988 b[4][145][1] = 7989 b[4][145][0] = 7990 
c    b[4][146][2] = 7991 b[4][146][1] = 7992 b[4][146][0] = 7993 
c    b[4][147][2] = 7994 b[4][147][1] = 7995 b[4][147][0] = 7996 
c    b[4][148][2] = 7997 b[4][148][1] = 7998 b[4][148][0] = 7999 
c    b[4][149][2] = 8000 b[4][149][1] = 8001 b[4][149][0] = 8002 
c    b[4][150][2] = 8003 b[4][150][1] = 8004 b[4][150][0] = 8005 
c    b[4][151][2] = 8006 b[4][151][1] = 8007 b[4][151][0] = 8008 
c    b[4][152][2] = 8009 b[4][152][1] = 8010 b[4][152][0] = 8011 
c    b[4][153][2] = 8012 b[4][153][1] = 8013 b[4][153][0] = 8014 
c    b[4][154][2] = 8015 b[4][154][1] = 8016 b[4][154][0] = 8017 
c    b[4][155][2] = 8018 b[4][155][1] = 8019 b[4][155][0] = 8020 
c    b[4][156][2] = 8021 b[4][156][1] = 8022 b[4][156][0] = 8023 
c    b[4][157][2] = 8024 b[4][157][1] = 8025 b[4][157][0] = 8026 
c    b[4][158][2] = 8027 b[4][158][1] = 8028 b[4][158][0] = 8029 
c    b[4][159][2] = 8030 b[4][159][1] = 8031 b[4][159][0] = 8032 
c    b[4][160][2] = 8033 b[4][160][1] = 8034 b[4][160][0] = 8035 
c    b[4][161][2] = 8036 b[4][161][1] = 8037 b[4][161][0] = 8038 
c    b[4][162][2] = 8039 b[4][162][1] = 8040 b[4][162][0] = 8041 
c    b[4][163][2] = 8042 b[4][163][1] = 8043 b[4][163][0] = 8044 
c    b[4][164][2] = 8045 b[4][164][1] = 8046 b[4][164][0] = 8047 
c    b[4][165][2] = 8048 b[4][165][1] = 8049 b[4][165][0] = 8050 
c    b[4][166][2] = 8051 b[4][166][1] = 8052 b[4][166][0] = 8053 
c    b[4][167][2] = 8054 b[4][167][1] = 8055 b[4][167][0] = 8056 
c    b[4][168][2] = 8057 b[4][168][1] = 8058 b[4][168][0] = 8059 
c    b[4][169][2] = 8060 b[4][169][1] = 8061 b[4][169][0] = 8062 
c    b[4][170][2] = 8063 b[4][170][1] = 8064 b[4][170][0] = 8065 
c    b[4][171][2] = 8066 b[4][171][1] = 8067 b[4][171][0] = 8068 
c    b[4][172][2] = 8069 b[4][172][1] = 8070 b[4][172][0] = 8071 
c    b[4][173][2] = 8072 b[4][173][1] = 8073 b[4][173][0] = 8074 
c    b[4][174][2] = 8075 b[4][174][1] = 8076 b[4][174][0] = 8077 
c    b[4][175][2] = 8078 b[4][175][1] = 8079 b[4][175][0] = 8080 
c    b[4][176][2] = 8081 b[4][176][1] = 8082 b[4][176][0] = 8083 
c    b[4][177][2] = 8084 b[4][177][1] = 8085 b[4][177][0] = 8086 
c    b[4][178][2] = 8087 b[4][178][1] = 8088 b[4][178][0] = 8089 
c    b[4][179][2] = 8090 b[4][179][1] = 8091 b[4][179][0] = 8092 
c    b[4][180][2] = 8093 b[4][180][1] = 8094 b[4][180][0] = 8095 
c    b[4][181][2] = 8096 b[4][181][1] = 8097 b[4][181][0] = 8098 
c    b[4][182][2] = 8099 b[4][182][1] = 8100 b[4][182][0] = 8101 
c    b[4][183][2] = 8102 b[4][183][1] = 8103 b[4][183][0] = 8104 
c    b[4][184][2] = 8105 b[4][184][1] = 8106 b[4][184][0] = 8107 
c    b[4][185][2] = 8108 b[4][185][1] = 8109 b[4][185][0] = 8110 
c    b[4][186][2] = 8111 b[4][186][1] = 8112 b[4][186][0] = 8113 
c    b[4][187][2] = 8114 b[4][187][1] = 8115 b[4][187][0] = 8116 
c    b[4][188][2] = 8117 b[4][188][1] = 8118 b[4][188][0] = 8119 
c    b[4][189][2] = 8120 b[4][189][1] = 8121 b[4][189][0] = 8122 
c    b[4][190][2] = 8123 b[4][190][1] = 8124 b[4][190][0] = 8125 
c    b[4][191][2] = 8126 b[4][191][1] = 8127 b[4][191][0] = 8128 
c    b[4][192][2] = 8129 b[4][192][1] = 8130 b[4][192][0] = 8131 
c    b[4][193][2] = 8132 b[4][193][1] = 8133 b[4][193][0] = 8134 
c    b[4][194][2] = 8135 b[4][194][1] = 8136 b[4][194][0] = 8137 
c    b[4][195][2] = 8138 b[4][195][1] = 8139 b[4][195][0] = 8140 
c    b[4][196][2] = 8141 b[4][196][1] = 8142 b[4][196][0] = 8143 
c    b[4][197][2] = 8144 b[4][197][1] = 8145 b[4][197][0] = 8146 
c    b[4][198][2] = 8147 b[4][198][1] = 8148 b[4][198][0] = 8149 
c    b[4][199][2] = 8150 b[4][199][1] = 8151 b[4][199][0] = 8152 
c    b[4][200][2] = 8153 b[4][200][1] = 8154 b[4][200][0] = 8155 
c    b[4][201][2] = 8156 b[4][201][1] = 8157 b[4][201][0] = 8158 
c    b[4][202][2] = 8159 b[4][202][1] = 8160 b[4][202][0] = 8161 
c    b[4][203][2] = 8162 b[4][203][1] = 8163 b[4][203][0] = 8164 
c    b[4][204][2] = 8165 b[4][204][1] = 8166 b[4][204][0] = 8167 
c    b[4][205][2] = 8168 b[4][205][1] = 8169 b[4][205][0] = 8170 
c    b[4][206][2] = 8171 b[4][206][1] = 8172 b[4][206][0] = 8173 
c    b[4][207][2] = 8174 b[4][207][1] = 8175 b[4][207][0] = 8176 
c    b[4][208][2] = 8177 b[4][208][1] = 8178 b[4][208][0] = 8179 
c    b[4][209][2] = 8180 b[4][209][1] = 8181 b[4][209][0] = 8182 
c    b[4][210][2] = 8183 b[4][210][1] = 8184 b[4][210][0] = 8185 
c    b[4][211][2] = 8186 b[4][211][1] = 8187 b[4][211][0] = 8188 
c    b[4][212][2] = 8189 b[4][212][1] = 8190 b[4][212][0] = 8191 
c    b[4][213][2] = 8192 b[4][213][1] = 8193 b[4][213][0] = 8194 
c    b[4][214][2] = 8195 b[4][214][1] = 8196 b[4][214][0] = 8197 
c    b[4][215][2] = 8198 b[4][215][1] = 8199 b[4][215][0] = 8200 
c    b[4][216][2] = 8201 b[4][216][1] = 8202 b[4][216][0] = 8203 
c    b[4][217][2] = 8204 b[4][217][1] = 8205 b[4][217][0] = 8206 
c    b[4][218][2] = 8207 b[4][218][1] = 8208 b[4][218][0] = 8209 
c    b[4][219][2] = 8210 b[4][219][1] = 8211 b[4][219][0] = 8212 
c    b[4][220][2] = 8213 b[4][220][1] = 8214 b[4][220][0] = 8215 
c    b[4][221][2] = 8216 b[4][221][1] = 8217 b[4][221][0] = 8218 
c    b[4][222][2] = 8219 b[4][222][1] = 8220 b[4][222][0] = 8221 
c    b[4][223][2] = 8222 b[4][223][1] = 8223 b[4][223][0] = 8224 
c    b[4][224][2] = 8225 b[4][224][1] = 8226 b[4][224][0] = 8227 
c    b[4][225][2] = 8228 b[4][225][1] = 8229 b[4][225][0] = 8230 
c    b[4][226][2] = 8231 b[4][226][1] = 8232 b[4][226][0] = 8233 
c    b[4][227][2] = 8234 b[4][227][1] = 8235 b[4][227][0] = 8236 
c    b[4][228][2] = 8237 b[4][228][1] = 8238 b[4][228][0] = 8239 
c    b[4][229][2] = 8240 b[4][229][1] = 8241 b[4][229][0] = 8242 
c    b[4][230][2] = 8243 b[4][230][1] = 8244 b[4][230][0] = 8245 
c    b[4][231][2] = 8246 b[4][231][1] = 8247 b[4][231][0] = 8248 
c    b[4][232][2] = 8249 b[4][232][1] = 8250 b[4][232][0] = 8251 
c    b[4][233][2] = 8252 b[4][233][1] = 8253 b[4][233][0] = 8254 
c    b[4][234][2] = 8255 b[4][234][1] = 8256 b[4][234][0] = 8257 
c    b[4][235][2] = 8258 b[4][235][1] = 8259 b[4][235][0] = 8260 
c    b[4][236][2] = 8261 b[4][236][1] = 8262 b[4][236][0] = 8263 
c    b[4][237][2] = 8264 b[4][237][1] = 8265 b[4][237][0] = 8266 
c    b[4][238][2] = 8267 b[4][238][1] = 8268 b[4][238][0] = 8269 
c    b[4][239][2] = 8270 b[4][239][1] = 8271 b[4][239][0] = 8272 
c    b[4][240][2] = 8273 b[4][240][1] = 8274 b[4][240][0] = 8275 
c    b[4][241][2] = 8276 b[4][241][1] = 8277 b[4][241][0] = 8278 
c    b[4][242][2] = 8279 b[4][242][1] = 8280 b[4][242][0] = 8281 
c    b[4][243][2] = 8282 b[4][243][1] = 8283 b[4][243][0] = 8284 
c    b[4][244][2] = 8285 b[4][244][1] = 8286 b[4][244][0] = 8287 
c    b[4][245][2] = 8288 b[4][245][1] = 8289 b[4][245][0] = 8290 
c    b[4][246][2] = 8291 b[4][246][1] = 8292 b[4][246][0] = 8293 
c    b[4][247][2] = 8294 b[4][247][1] = 8295 b[4][247][0] = 8296 
c    b[4][248][2] = 8297 b[4][248][1] = 8298 b[4][248][0] = 8299 
c    b[4][249][2] = 8300 b[4][249][1] = 8301 b[4][249][0] = 8302 
c    b[4][250][2] = 8303 b[4][250][1] = 8304 b[4][250][0] = 8305 
c    b[4][251][2] = 8306 b[4][251][1] = 8307 b[4][251][0] = 8308 
c    b[4][252][2] = 8309 b[4][252][1] = 8310 b[4][252][0] = 8311 
c    b[4][253][2] = 8312 b[4][253][1] = 8313 b[4][253][0] = 8314 
c    b[4][254][2] = 8315 b[4][254][1] = 8316 b[4][254][0] = 8317 
c    b[4][255][2] = 8318 b[4][255][1] = 8319 b[4][255][0] = 8320 
c    b[4][256][2] = 8321 b[4][256][1] = 8322 b[4][256][0] = 8323 
c    b[4][257][2] = 8324 b[4][257][1] = 8325 b[4][257][0] = 8326 
c    b[4][258][2] = 8327 b[4][258][1] = 8328 b[4][258][0] = 8329 
c    b[4][259][2] = 8330 b[4][259][1] = 8331 b[4][259][0] = 8332 
c    b[4][260][2] = 8333 b[4][260][1] = 8334 b[4][260][0] = 8335 
c    b[4][261][2] = 8336 b[4][261][1] = 8337 b[4][261][0] = 8338 
c    b[4][262][2] = 8339 b[4][262][1] = 8340 b[4][262][0] = 8341 
c    b[4][263][2] = 8342 b[4][263][1] = 8343 b[4][263][0] = 8344 
c    b[4][264][2] = 8345 b[4][264][1] = 8346 b[4][264][0] = 8347 
c    b[4][265][2] = 8348 b[4][265][1] = 8349 b[4][265][0] = 8350 
c    b[4][266][2] = 8351 b[4][266][1] = 8352 b[4][266][0] = 8353 
c    b[4][267][2] = 8354 b[4][267][1] = 8355 b[4][267][0] = 8356 
c    b[4][268][2] = 8357 b[4][268][1] = 8358 b[4][268][0] = 8359 
c    b[4][269][2] = 8360 b[4][269][1] = 8361 b[4][269][0] = 8362 
c    b[4][270][2] = 8363 b[4][270][1] = 8364 b[4][270][0] = 8365 
c    b[4][271][2] = 8366 b[4][271][1] = 8367 b[4][271][0] = 8368 
c    b[4][272][2] = 8369 b[4][272][1] = 8370 b[4][272][0] = 8371 
c    b[4][273][2] = 8372 b[4][273][1] = 8373 b[4][273][0] = 8374 
c    b[4][274][2] = 8375 b[4][274][1] = 8376 b[4][274][0] = 8377 
c    b[4][275][2] = 8378 b[4][275][1] = 8379 b[4][275][0] = 8380 
c    b[4][276][2] = 8381 b[4][276][1] = 8382 b[4][276][0] = 8383 
c    b[4][277][2] = 8384 b[4][277][1] = 8385 b[4][277][0] = 8386 
c    b[4][278][2] = 8387 b[4][278][1] = 8388 b[4][278][0] = 8389 
c    b[4][279][2] = 8390 b[4][279][1] = 8391 b[4][279][0] = 8392 
c    b[4][280][2] = 8393 b[4][280][1] = 8394 b[4][280][0] = 8395 
c    b[4][281][2] = 8396 b[4][281][1] = 8397 b[4][281][0] = 8398 
c    b[4][282][2] = 8399 b[4][282][1] = 8400 b[4][282][0] = 8401 
c    b[4][283][2] = 8402 b[4][283][1] = 8403 b[4][283][0] = 8404 
c    b[4][284][2] = 8405 b[4][284][1] = 8406 b[4][284][0] = 8407 
c    b[4][285][2] = 8408 b[4][285][1] = 8409 b[4][285][0] = 8410 
c    b[4][286][2] = 8411 b[4][286][1] = 8412 b[4][286][0] = 8413 
c    b[4][287][2] = 8414 b[4][287][1] = 8415 b[4][287][0] = 8416 
c    b[4][288][2] = 8417 b[4][288][1] = 8418 b[4][288][0] = 8419 
c    b[4][289][2] = 8420 b[4][289][1] = 8421 b[4][289][0] = 8422 
c    b[4][290][2] = 8423 b[4][290][1] = 8424 b[4][290][0] = 8425 
c    b[4][291][2] = 8426 b[4][291][1] = 8427 b[4][291][0] = 8428 

c    b[5][1][2] = 8429 b[5][1][1] = 8430 b[5][1][0] = 8431 
c    b[5][2][2] = 8432 b[5][2][1] = 8433 b[5][2][0] = 8434 
c    b[5][3][2] = 8435 b[5][3][1] = 8436 b[5][3][0] = 8437 
c    b[5][4][2] = 8438 b[5][4][1] = 8439 b[5][4][0] = 8440 
c    b[5][5][2] = 8441 b[5][5][1] = 8442 b[5][5][0] = 8443 
c    b[5][6][2] = 8444 b[5][6][1] = 8445 b[5][6][0] = 8446 
c    b[5][7][2] = 8447 b[5][7][1] = 8448 b[5][7][0] = 8449 
c    b[5][8][2] = 8450 b[5][8][1] = 8451 b[5][8][0] = 8452 
c    b[5][9][2] = 8453 b[5][9][1] = 8454 b[5][9][0] = 8455 
c    b[5][10][2] = 8456 b[5][10][1] = 8457 b[5][10][0] = 8458 
c    b[5][11][2] = 8459 b[5][11][1] = 8460 b[5][11][0] = 8461 
c    b[5][12][2] = 8462 b[5][12][1] = 8463 b[5][12][0] = 8464 
c    b[5][13][2] = 8465 b[5][13][1] = 8466 b[5][13][0] = 8467 
c    b[5][14][2] = 8468 b[5][14][1] = 8469 b[5][14][0] = 8470 
c    b[5][15][2] = 8471 b[5][15][1] = 8472 b[5][15][0] = 8473 
c    b[5][16][2] = 8474 b[5][16][1] = 8475 b[5][16][0] = 8476 
c    b[5][17][2] = 8477 b[5][17][1] = 8478 b[5][17][0] = 8479 
c    b[5][18][2] = 8480 b[5][18][1] = 8481 b[5][18][0] = 8482 
c    b[5][19][2] = 8483 b[5][19][1] = 8484 b[5][19][0] = 8485 
c    b[5][20][2] = 8486 b[5][20][1] = 8487 b[5][20][0] = 8488 
c    b[5][21][2] = 8489 b[5][21][1] = 8490 b[5][21][0] = 8491 
c    b[5][22][2] = 8492 b[5][22][1] = 8493 b[5][22][0] = 8494 
c    b[5][23][2] = 8495 b[5][23][1] = 8496 b[5][23][0] = 8497 
c    b[5][24][2] = 8498 b[5][24][1] = 8499 b[5][24][0] = 8500 
c    b[5][25][2] = 8501 b[5][25][1] = 8502 b[5][25][0] = 8503 
c    b[5][26][2] = 8504 b[5][26][1] = 8505 b[5][26][0] = 8506 
c    b[5][27][2] = 8507 b[5][27][1] = 8508 b[5][27][0] = 8509 
c    b[5][28][2] = 8510 b[5][28][1] = 8511 b[5][28][0] = 8512 
c    b[5][29][2] = 8513 b[5][29][1] = 8514 b[5][29][0] = 8515 
c    b[5][30][2] = 8516 b[5][30][1] = 8517 b[5][30][0] = 8518 
c    b[5][31][2] = 8519 b[5][31][1] = 8520 b[5][31][0] = 8521 
c    b[5][32][2] = 8522 b[5][32][1] = 8523 b[5][32][0] = 8524 
c    b[5][33][2] = 8525 b[5][33][1] = 8526 b[5][33][0] = 8527 
c    b[5][34][2] = 8528 b[5][34][1] = 8529 b[5][34][0] = 8530 
c    b[5][35][2] = 8531 b[5][35][1] = 8532 b[5][35][0] = 8533 
c    b[5][36][2] = 8534 b[5][36][1] = 8535 b[5][36][0] = 8536 
c    b[5][37][2] = 8537 b[5][37][1] = 8538 b[5][37][0] = 8539 
c    b[5][38][2] = 8540 b[5][38][1] = 8541 b[5][38][0] = 8542 
c    b[5][39][2] = 8543 b[5][39][1] = 8544 b[5][39][0] = 8545 
c    b[5][40][2] = 8546 b[5][40][1] = 8547 b[5][40][0] = 8548 
c    b[5][41][2] = 8549 b[5][41][1] = 8550 b[5][41][0] = 8551 
c    b[5][42][2] = 8552 b[5][42][1] = 8553 b[5][42][0] = 8554 
c    b[5][43][2] = 8555 b[5][43][1] = 8556 b[5][43][0] = 8557 
c    b[5][44][2] = 8558 b[5][44][1] = 8559 b[5][44][0] = 8560 
c    b[5][45][2] = 8561 b[5][45][1] = 8562 b[5][45][0] = 8563 
c    b[5][46][2] = 8564 b[5][46][1] = 8565 b[5][46][0] = 8566 
c    b[5][47][2] = 8567 b[5][47][1] = 8568 b[5][47][0] = 8569 
c    b[5][48][2] = 8570 b[5][48][1] = 8571 b[5][48][0] = 8572 
c    b[5][49][2] = 8573 b[5][49][1] = 8574 b[5][49][0] = 8575 
c    b[5][50][2] = 8576 b[5][50][1] = 8577 b[5][50][0] = 8578 
c    b[5][51][2] = 8579 b[5][51][1] = 8580 b[5][51][0] = 8581 
c    b[5][52][2] = 8582 b[5][52][1] = 8583 b[5][52][0] = 8584 
c    b[5][53][2] = 8585 b[5][53][1] = 8586 b[5][53][0] = 8587 
c    b[5][54][2] = 8588 b[5][54][1] = 8589 b[5][54][0] = 8590 
c    b[5][55][2] = 8591 b[5][55][1] = 8592 b[5][55][0] = 8593 
c    b[5][56][2] = 8594 b[5][56][1] = 8595 b[5][56][0] = 8596 
c    b[5][57][2] = 8597 b[5][57][1] = 8598 b[5][57][0] = 8599 
c    b[5][58][2] = 8600 b[5][58][1] = 8601 b[5][58][0] = 8602 
c    b[5][59][2] = 8603 b[5][59][1] = 8604 b[5][59][0] = 8605 
c    b[5][60][2] = 8606 b[5][60][1] = 8607 b[5][60][0] = 8608 
c    b[5][61][2] = 8609 b[5][61][1] = 8610 b[5][61][0] = 8611 
c    b[5][62][2] = 8612 b[5][62][1] = 8613 b[5][62][0] = 8614 
c    b[5][63][2] = 8615 b[5][63][1] = 8616 b[5][63][0] = 8617 
c    b[5][64][2] = 8618 b[5][64][1] = 8619 b[5][64][0] = 8620 
c    b[5][65][2] = 8621 b[5][65][1] = 8622 b[5][65][0] = 8623 
c    b[5][66][2] = 8624 b[5][66][1] = 8625 b[5][66][0] = 8626 
c    b[5][67][2] = 8627 b[5][67][1] = 8628 b[5][67][0] = 8629 
c    b[5][68][2] = 8630 b[5][68][1] = 8631 b[5][68][0] = 8632 
c    b[5][69][2] = 8633 b[5][69][1] = 8634 b[5][69][0] = 8635 
c    b[5][70][2] = 8636 b[5][70][1] = 8637 b[5][70][0] = 8638 
c    b[5][71][2] = 8639 b[5][71][1] = 8640 b[5][71][0] = 8641 
c    b[5][72][2] = 8642 b[5][72][1] = 8643 b[5][72][0] = 8644 
c    b[5][73][2] = 8645 b[5][73][1] = 8646 b[5][73][0] = 8647 
c    b[5][74][2] = 8648 b[5][74][1] = 8649 b[5][74][0] = 8650 
c    b[5][75][2] = 8651 b[5][75][1] = 8652 b[5][75][0] = 8653 
c    b[5][76][2] = 8654 b[5][76][1] = 8655 b[5][76][0] = 8656 
c    b[5][77][2] = 8657 b[5][77][1] = 8658 b[5][77][0] = 8659 
c    b[5][78][2] = 8660 b[5][78][1] = 8661 b[5][78][0] = 8662 
c    b[5][79][2] = 8663 b[5][79][1] = 8664 b[5][79][0] = 8665 
c    b[5][80][2] = 8666 b[5][80][1] = 8667 b[5][80][0] = 8668 
c    b[5][81][2] = 8669 b[5][81][1] = 8670 b[5][81][0] = 8671 
c    b[5][82][2] = 8672 b[5][82][1] = 8673 b[5][82][0] = 8674 
c    b[5][83][2] = 8675 b[5][83][1] = 8676 b[5][83][0] = 8677 
c    b[5][84][2] = 8678 b[5][84][1] = 8679 b[5][84][0] = 8680 
c    b[5][85][2] = 8681 b[5][85][1] = 8682 b[5][85][0] = 8683 
c    b[5][86][2] = 8684 b[5][86][1] = 8685 b[5][86][0] = 8686 
c    b[5][87][2] = 8687 b[5][87][1] = 8688 b[5][87][0] = 8689 
c    b[5][88][2] = 8690 b[5][88][1] = 8691 b[5][88][0] = 8692 
c    b[5][89][2] = 8693 b[5][89][1] = 8694 b[5][89][0] = 8695 
c    b[5][90][2] = 8696 b[5][90][1] = 8697 b[5][90][0] = 8698 
c    b[5][91][2] = 8699 b[5][91][1] = 8700 b[5][91][0] = 8701 
c    b[5][92][2] = 8702 b[5][92][1] = 8703 b[5][92][0] = 8704 
c    b[5][93][2] = 8705 b[5][93][1] = 8706 b[5][93][0] = 8707 
c    b[5][94][2] = 8708 b[5][94][1] = 8709 b[5][94][0] = 8710 
c    b[5][95][2] = 8711 b[5][95][1] = 8712 b[5][95][0] = 8713 
c    b[5][96][2] = 8714 b[5][96][1] = 8715 b[5][96][0] = 8716 
c    b[5][97][2] = 8717 b[5][97][1] = 8718 b[5][97][0] = 8719 
c    b[5][98][2] = 8720 b[5][98][1] = 8721 b[5][98][0] = 8722 
c    b[5][99][2] = 8723 b[5][99][1] = 8724 b[5][99][0] = 8725 
c    b[5][100][2] = 8726 b[5][100][1] = 8727 b[5][100][0] = 8728 
c    b[5][101][2] = 8729 b[5][101][1] = 8730 b[5][101][0] = 8731 
c    b[5][102][2] = 8732 b[5][102][1] = 8733 b[5][102][0] = 8734 
c    b[5][103][2] = 8735 b[5][103][1] = 8736 b[5][103][0] = 8737 
c    b[5][104][2] = 8738 b[5][104][1] = 8739 b[5][104][0] = 8740 
c    b[5][105][2] = 8741 b[5][105][1] = 8742 b[5][105][0] = 8743 
c    b[5][106][2] = 8744 b[5][106][1] = 8745 b[5][106][0] = 8746 
c    b[5][107][2] = 8747 b[5][107][1] = 8748 b[5][107][0] = 8749 
c    b[5][108][2] = 8750 b[5][108][1] = 8751 b[5][108][0] = 8752 
c    b[5][109][2] = 8753 b[5][109][1] = 8754 b[5][109][0] = 8755 
c    b[5][110][2] = 8756 b[5][110][1] = 8757 b[5][110][0] = 8758 
c    b[5][111][2] = 8759 b[5][111][1] = 8760 b[5][111][0] = 8761 
c    b[5][112][2] = 8762 b[5][112][1] = 8763 b[5][112][0] = 8764 
c    b[5][113][2] = 8765 b[5][113][1] = 8766 b[5][113][0] = 8767 
c    b[5][114][2] = 8768 b[5][114][1] = 8769 b[5][114][0] = 8770 
c    b[5][115][2] = 8771 b[5][115][1] = 8772 b[5][115][0] = 8773 
c    b[5][116][2] = 8774 b[5][116][1] = 8775 b[5][116][0] = 8776 
c    b[5][117][2] = 8777 b[5][117][1] = 8778 b[5][117][0] = 8779 
c    b[5][118][2] = 8780 b[5][118][1] = 8781 b[5][118][0] = 8782 
c    b[5][119][2] = 8783 b[5][119][1] = 8784 b[5][119][0] = 8785 
c    b[5][120][2] = 8786 b[5][120][1] = 8787 b[5][120][0] = 8788 
c    b[5][121][2] = 8789 b[5][121][1] = 8790 b[5][121][0] = 8791 
c    b[5][122][2] = 8792 b[5][122][1] = 8793 b[5][122][0] = 8794 
c    b[5][123][2] = 8795 b[5][123][1] = 8796 b[5][123][0] = 8797 
c    b[5][124][2] = 8798 b[5][124][1] = 8799 b[5][124][0] = 8800 
c    b[5][125][2] = 8801 b[5][125][1] = 8802 b[5][125][0] = 8803 
c    b[5][126][2] = 8804 b[5][126][1] = 8805 b[5][126][0] = 8806 
c    b[5][127][2] = 8807 b[5][127][1] = 8808 b[5][127][0] = 8809 
c    b[5][128][2] = 8810 b[5][128][1] = 8811 b[5][128][0] = 8812 
c    b[5][129][2] = 8813 b[5][129][1] = 8814 b[5][129][0] = 8815 
c    b[5][130][2] = 8816 b[5][130][1] = 8817 b[5][130][0] = 8818 
c    b[5][131][2] = 8819 b[5][131][1] = 8820 b[5][131][0] = 8821 
c    b[5][132][2] = 8822 b[5][132][1] = 8823 b[5][132][0] = 8824 
c    b[5][133][2] = 8825 b[5][133][1] = 8826 b[5][133][0] = 8827 
c    b[5][134][2] = 8828 b[5][134][1] = 8829 b[5][134][0] = 8830 
c    b[5][135][2] = 8831 b[5][135][1] = 8832 b[5][135][0] = 8833 
c    b[5][136][2] = 8834 b[5][136][1] = 8835 b[5][136][0] = 8836 
c    b[5][137][2] = 8837 b[5][137][1] = 8838 b[5][137][0] = 8839 
c    b[5][138][2] = 8840 b[5][138][1] = 8841 b[5][138][0] = 8842 
c    b[5][139][2] = 8843 b[5][139][1] = 8844 b[5][139][0] = 8845 
c    b[5][140][2] = 8846 b[5][140][1] = 8847 b[5][140][0] = 8848 
c    b[5][141][2] = 8849 b[5][141][1] = 8850 b[5][141][0] = 8851 
c    b[5][142][2] = 8852 b[5][142][1] = 8853 b[5][142][0] = 8854 
c    b[5][143][2] = 8855 b[5][143][1] = 8856 b[5][143][0] = 8857 
c    b[5][144][2] = 8858 b[5][144][1] = 8859 b[5][144][0] = 8860 
c    b[5][145][2] = 8861 b[5][145][1] = 8862 b[5][145][0] = 8863 
c    b[5][146][2] = 8864 b[5][146][1] = 8865 b[5][146][0] = 8866 
c    b[5][147][2] = 8867 b[5][147][1] = 8868 b[5][147][0] = 8869 
c    b[5][148][2] = 8870 b[5][148][1] = 8871 b[5][148][0] = 8872 
c    b[5][149][2] = 8873 b[5][149][1] = 8874 b[5][149][0] = 8875 
c    b[5][150][2] = 8876 b[5][150][1] = 8877 b[5][150][0] = 8878 
c    b[5][151][2] = 8879 b[5][151][1] = 8880 b[5][151][0] = 8881 
c    b[5][152][2] = 8882 b[5][152][1] = 8883 b[5][152][0] = 8884 
c    b[5][153][2] = 8885 b[5][153][1] = 8886 b[5][153][0] = 8887 
c    b[5][154][2] = 8888 b[5][154][1] = 8889 b[5][154][0] = 8890 
c    b[5][155][2] = 8891 b[5][155][1] = 8892 b[5][155][0] = 8893 
c    b[5][156][2] = 8894 b[5][156][1] = 8895 b[5][156][0] = 8896 
c    b[5][157][2] = 8897 b[5][157][1] = 8898 b[5][157][0] = 8899 
c    b[5][158][2] = 8900 b[5][158][1] = 8901 b[5][158][0] = 8902 
c    b[5][159][2] = 8903 b[5][159][1] = 8904 b[5][159][0] = 8905 
c    b[5][160][2] = 8906 b[5][160][1] = 8907 b[5][160][0] = 8908 
c    b[5][161][2] = 8909 b[5][161][1] = 8910 b[5][161][0] = 8911 
c    b[5][162][2] = 8912 b[5][162][1] = 8913 b[5][162][0] = 8914 
c    b[5][163][2] = 8915 b[5][163][1] = 8916 b[5][163][0] = 8917 
c    b[5][164][2] = 8918 b[5][164][1] = 8919 b[5][164][0] = 8920 
c    b[5][165][2] = 8921 b[5][165][1] = 8922 b[5][165][0] = 8923 
c    b[5][166][2] = 8924 b[5][166][1] = 8925 b[5][166][0] = 8926 
c    b[5][167][2] = 8927 b[5][167][1] = 8928 b[5][167][0] = 8929 
c    b[5][168][2] = 8930 b[5][168][1] = 8931 b[5][168][0] = 8932 
c    b[5][169][2] = 8933 b[5][169][1] = 8934 b[5][169][0] = 8935 
c    b[5][170][2] = 8936 b[5][170][1] = 8937 b[5][170][0] = 8938 
c    b[5][171][2] = 8939 b[5][171][1] = 8940 b[5][171][0] = 8941 
c    b[5][172][2] = 8942 b[5][172][1] = 8943 b[5][172][0] = 8944 
c    b[5][173][2] = 8945 b[5][173][1] = 8946 b[5][173][0] = 8947 
c    b[5][174][2] = 8948 b[5][174][1] = 8949 b[5][174][0] = 8950 
c    b[5][175][2] = 8951 b[5][175][1] = 8952 b[5][175][0] = 8953 
c    b[5][176][2] = 8954 b[5][176][1] = 8955 b[5][176][0] = 8956 
c    b[5][177][2] = 8957 b[5][177][1] = 8958 b[5][177][0] = 8959 
c    b[5][178][2] = 8960 b[5][178][1] = 8961 b[5][178][0] = 8962 
c    b[5][179][2] = 8963 b[5][179][1] = 8964 b[5][179][0] = 8965 
c    b[5][180][2] = 8966 b[5][180][1] = 8967 b[5][180][0] = 8968 
c    b[5][181][2] = 8969 b[5][181][1] = 8970 b[5][181][0] = 8971 
c    b[5][182][2] = 8972 b[5][182][1] = 8973 b[5][182][0] = 8974 
c    b[5][183][2] = 8975 b[5][183][1] = 8976 b[5][183][0] = 8977 
c    b[5][184][2] = 8978 b[5][184][1] = 8979 b[5][184][0] = 8980 
c    b[5][185][2] = 8981 b[5][185][1] = 8982 b[5][185][0] = 8983 
c    b[5][186][2] = 8984 b[5][186][1] = 8985 b[5][186][0] = 8986 
c    b[5][187][2] = 8987 b[5][187][1] = 8988 b[5][187][0] = 8989 
c    b[5][188][2] = 8990 b[5][188][1] = 8991 b[5][188][0] = 8992 
c    b[5][189][2] = 8993 b[5][189][1] = 8994 b[5][189][0] = 8995 
c    b[5][190][2] = 8996 b[5][190][1] = 8997 b[5][190][0] = 8998 
c    b[5][191][2] = 8999 b[5][191][1] = 9000 b[5][191][0] = 9001 
c    b[5][192][2] = 9002 b[5][192][1] = 9003 b[5][192][0] = 9004 
c    b[5][193][2] = 9005 b[5][193][1] = 9006 b[5][193][0] = 9007 
c    b[5][194][2] = 9008 b[5][194][1] = 9009 b[5][194][0] = 9010 
c    b[5][195][2] = 9011 b[5][195][1] = 9012 b[5][195][0] = 9013 
c    b[5][196][2] = 9014 b[5][196][1] = 9015 b[5][196][0] = 9016 
c    b[5][197][2] = 9017 b[5][197][1] = 9018 b[5][197][0] = 9019 
c    b[5][198][2] = 9020 b[5][198][1] = 9021 b[5][198][0] = 9022 
c    b[5][199][2] = 9023 b[5][199][1] = 9024 b[5][199][0] = 9025 
c    b[5][200][2] = 9026 b[5][200][1] = 9027 b[5][200][0] = 9028 
c    b[5][201][2] = 9029 b[5][201][1] = 9030 b[5][201][0] = 9031 
c    b[5][202][2] = 9032 b[5][202][1] = 9033 b[5][202][0] = 9034 
c    b[5][203][2] = 9035 b[5][203][1] = 9036 b[5][203][0] = 9037 
c    b[5][204][2] = 9038 b[5][204][1] = 9039 b[5][204][0] = 9040 
c    b[5][205][2] = 9041 b[5][205][1] = 9042 b[5][205][0] = 9043 
c    b[5][206][2] = 9044 b[5][206][1] = 9045 b[5][206][0] = 9046 
c    b[5][207][2] = 9047 b[5][207][1] = 9048 b[5][207][0] = 9049 
c    b[5][208][2] = 9050 b[5][208][1] = 9051 b[5][208][0] = 9052 
c    b[5][209][2] = 9053 b[5][209][1] = 9054 b[5][209][0] = 9055 
c    b[5][210][2] = 9056 b[5][210][1] = 9057 b[5][210][0] = 9058 
c    b[5][211][2] = 9059 b[5][211][1] = 9060 b[5][211][0] = 9061 
c    b[5][212][2] = 9062 b[5][212][1] = 9063 b[5][212][0] = 9064 
c    b[5][213][2] = 9065 b[5][213][1] = 9066 b[5][213][0] = 9067 
c    b[5][214][2] = 9068 b[5][214][1] = 9069 b[5][214][0] = 9070 
c    b[5][215][2] = 9071 b[5][215][1] = 9072 b[5][215][0] = 9073 
c    b[5][216][2] = 9074 b[5][216][1] = 9075 b[5][216][0] = 9076 
c    b[5][217][2] = 9077 b[5][217][1] = 9078 b[5][217][0] = 9079 
c    b[5][218][2] = 9080 b[5][218][1] = 9081 b[5][218][0] = 9082 
c    b[5][219][2] = 9083 b[5][219][1] = 9084 b[5][219][0] = 9085 
c    b[5][220][2] = 9086 b[5][220][1] = 9087 b[5][220][0] = 9088 
c    b[5][221][2] = 9089 b[5][221][1] = 9090 b[5][221][0] = 9091 
c    b[5][222][2] = 9092 b[5][222][1] = 9093 b[5][222][0] = 9094 
c    b[5][223][2] = 9095 b[5][223][1] = 9096 b[5][223][0] = 9097 
c    b[5][224][2] = 9098 b[5][224][1] = 9099 b[5][224][0] = 9100 
c    b[5][225][2] = 9101 b[5][225][1] = 9102 b[5][225][0] = 9103 
c    b[5][226][2] = 9104 b[5][226][1] = 9105 b[5][226][0] = 9106 
c    b[5][227][2] = 9107 b[5][227][1] = 9108 b[5][227][0] = 9109 
c    b[5][228][2] = 9110 b[5][228][1] = 9111 b[5][228][0] = 9112 
c    b[5][229][2] = 9113 b[5][229][1] = 9114 b[5][229][0] = 9115 
c    b[5][230][2] = 9116 b[5][230][1] = 9117 b[5][230][0] = 9118 
c    b[5][231][2] = 9119 b[5][231][1] = 9120 b[5][231][0] = 9121 
c    b[5][232][2] = 9122 b[5][232][1] = 9123 b[5][232][0] = 9124 
c    b[5][233][2] = 9125 b[5][233][1] = 9126 b[5][233][0] = 9127 

c    b[6][1][2] = 9128 b[6][1][1] = 9129 b[6][1][0] = 9130 
c    b[6][2][2] = 9131 b[6][2][1] = 9132 b[6][2][0] = 9133 
c    b[6][3][2] = 9134 b[6][3][1] = 9135 b[6][3][0] = 9136 
c    b[6][4][2] = 9137 b[6][4][1] = 9138 b[6][4][0] = 9139 
c    b[6][5][2] = 9140 b[6][5][1] = 9141 b[6][5][0] = 9142 
c    b[6][6][2] = 9143 b[6][6][1] = 9144 b[6][6][0] = 9145 
c    b[6][7][2] = 9146 b[6][7][1] = 9147 b[6][7][0] = 9148 
c    b[6][8][2] = 9149 b[6][8][1] = 9150 b[6][8][0] = 9151 
c    b[6][9][2] = 9152 b[6][9][1] = 9153 b[6][9][0] = 9154 
c    b[6][10][2] = 9155 b[6][10][1] = 9156 b[6][10][0] = 9157 
c    b[6][11][2] = 9158 b[6][11][1] = 9159 b[6][11][0] = 9160 
c    b[6][12][2] = 9161 b[6][12][1] = 9162 b[6][12][0] = 9163 
c    b[6][13][2] = 9164 b[6][13][1] = 9165 b[6][13][0] = 9166 
c    b[6][14][2] = 9167 b[6][14][1] = 9168 b[6][14][0] = 9169 
c    b[6][15][2] = 9170 b[6][15][1] = 9171 b[6][15][0] = 9172 
c    b[6][16][2] = 9173 b[6][16][1] = 9174 b[6][16][0] = 9175 
c    b[6][17][2] = 9176 b[6][17][1] = 9177 b[6][17][0] = 9178 
c    b[6][18][2] = 9179 b[6][18][1] = 9180 b[6][18][0] = 9181 
c    b[6][19][2] = 9182 b[6][19][1] = 9183 b[6][19][0] = 9184 
c    b[6][20][2] = 9185 b[6][20][1] = 9186 b[6][20][0] = 9187 
c    b[6][21][2] = 9188 b[6][21][1] = 9189 b[6][21][0] = 9190 
c    b[6][22][2] = 9191 b[6][22][1] = 9192 b[6][22][0] = 9193 
c    b[6][23][2] = 9194 b[6][23][1] = 9195 b[6][23][0] = 9196 
c    b[6][24][2] = 9197 b[6][24][1] = 9198 b[6][24][0] = 9199 
c    b[6][25][2] = 9200 b[6][25][1] = 9201 b[6][25][0] = 9202 
c    b[6][26][2] = 9203 b[6][26][1] = 9204 b[6][26][0] = 9205 
c    b[6][27][2] = 9206 b[6][27][1] = 9207 b[6][27][0] = 9208 
c    b[6][28][2] = 9209 b[6][28][1] = 9210 b[6][28][0] = 9211 
c    b[6][29][2] = 9212 b[6][29][1] = 9213 b[6][29][0] = 9214 
c    b[6][30][2] = 9215 b[6][30][1] = 9216 b[6][30][0] = 9217 
c    b[6][31][2] = 9218 b[6][31][1] = 9219 b[6][31][0] = 9220 
c    b[6][32][2] = 9221 b[6][32][1] = 9222 b[6][32][0] = 9223 
c    b[6][33][2] = 9224 b[6][33][1] = 9225 b[6][33][0] = 9226 
c    b[6][34][2] = 9227 b[6][34][1] = 9228 b[6][34][0] = 9229 
c    b[6][35][2] = 9230 b[6][35][1] = 9231 b[6][35][0] = 9232 
c    b[6][36][2] = 9233 b[6][36][1] = 9234 b[6][36][0] = 9235 
c    b[6][37][2] = 9236 b[6][37][1] = 9237 b[6][37][0] = 9238 
c    b[6][38][2] = 9239 b[6][38][1] = 9240 b[6][38][0] = 9241 
c    b[6][39][2] = 9242 b[6][39][1] = 9243 b[6][39][0] = 9244 
c    b[6][40][2] = 9245 b[6][40][1] = 9246 b[6][40][0] = 9247 
c    b[6][41][2] = 9248 b[6][41][1] = 9249 b[6][41][0] = 9250 
c    b[6][42][2] = 9251 b[6][42][1] = 9252 b[6][42][0] = 9253 
c    b[6][43][2] = 9254 b[6][43][1] = 9255 b[6][43][0] = 9256 
c    b[6][44][2] = 9257 b[6][44][1] = 9258 b[6][44][0] = 9259 
c    b[6][45][2] = 9260 b[6][45][1] = 9261 b[6][45][0] = 9262 
c    b[6][46][2] = 9263 b[6][46][1] = 9264 b[6][46][0] = 9265 
c    b[6][47][2] = 9266 b[6][47][1] = 9267 b[6][47][0] = 9268 
c    b[6][48][2] = 9269 b[6][48][1] = 9270 b[6][48][0] = 9271 
c    b[6][49][2] = 9272 b[6][49][1] = 9273 b[6][49][0] = 9274 
c    b[6][50][2] = 9275 b[6][50][1] = 9276 b[6][50][0] = 9277 
c    b[6][51][2] = 9278 b[6][51][1] = 9279 b[6][51][0] = 9280 
c    b[6][52][2] = 9281 b[6][52][1] = 9282 b[6][52][0] = 9283 
c    b[6][53][2] = 9284 b[6][53][1] = 9285 b[6][53][0] = 9286 
c    b[6][54][2] = 9287 b[6][54][1] = 9288 b[6][54][0] = 9289 
c    b[6][55][2] = 9290 b[6][55][1] = 9291 b[6][55][0] = 9292 
c    b[6][56][2] = 9293 b[6][56][1] = 9294 b[6][56][0] = 9295 
c    b[6][57][2] = 9296 b[6][57][1] = 9297 b[6][57][0] = 9298 
c    b[6][58][2] = 9299 b[6][58][1] = 9300 b[6][58][0] = 9301 
c    b[6][59][2] = 9302 b[6][59][1] = 9303 b[6][59][0] = 9304 
c    b[6][60][2] = 9305 b[6][60][1] = 9306 b[6][60][0] = 9307 
c    b[6][61][2] = 9308 b[6][61][1] = 9309 b[6][61][0] = 9310 
c    b[6][62][2] = 9311 b[6][62][1] = 9312 b[6][62][0] = 9313 
c    b[6][63][2] = 9314 b[6][63][1] = 9315 b[6][63][0] = 9316 
c    b[6][64][2] = 9317 b[6][64][1] = 9318 b[6][64][0] = 9319 
c    b[6][65][2] = 9320 b[6][65][1] = 9321 b[6][65][0] = 9322 
c    b[6][66][2] = 9323 b[6][66][1] = 9324 b[6][66][0] = 9325 
c    b[6][67][2] = 9326 b[6][67][1] = 9327 b[6][67][0] = 9328 
c    b[6][68][2] = 9329 b[6][68][1] = 9330 b[6][68][0] = 9331 
c    b[6][69][2] = 9332 b[6][69][1] = 9333 b[6][69][0] = 9334 
c    b[6][70][2] = 9335 b[6][70][1] = 9336 b[6][70][0] = 9337 
c    b[6][71][2] = 9338 b[6][71][1] = 9339 b[6][71][0] = 9340 
c    b[6][72][2] = 9341 b[6][72][1] = 9342 b[6][72][0] = 9343 
c    b[6][73][2] = 9344 b[6][73][1] = 9345 b[6][73][0] = 9346 
c    b[6][74][2] = 9347 b[6][74][1] = 9348 b[6][74][0] = 9349 
c    b[6][75][2] = 9350 b[6][75][1] = 9351 b[6][75][0] = 9352 
c    b[6][76][2] = 9353 b[6][76][1] = 9354 b[6][76][0] = 9355 
c    b[6][77][2] = 9356 b[6][77][1] = 9357 b[6][77][0] = 9358 
c    b[6][78][2] = 9359 b[6][78][1] = 9360 b[6][78][0] = 9361 
c    b[6][79][2] = 9362 b[6][79][1] = 9363 b[6][79][0] = 9364 
c    b[6][80][2] = 9365 b[6][80][1] = 9366 b[6][80][0] = 9367 
c    b[6][81][2] = 9368 b[6][81][1] = 9369 b[6][81][0] = 9370 
c    b[6][82][2] = 9371 b[6][82][1] = 9372 b[6][82][0] = 9373 
c    b[6][83][2] = 9374 b[6][83][1] = 9375 b[6][83][0] = 9376 
c    b[6][84][2] = 9377 b[6][84][1] = 9378 b[6][84][0] = 9379 
c    b[6][85][2] = 9380 b[6][85][1] = 9381 b[6][85][0] = 9382 
c    b[6][86][2] = 9383 b[6][86][1] = 9384 b[6][86][0] = 9385 
c    b[6][87][2] = 9386 b[6][87][1] = 9387 b[6][87][0] = 9388 
c    b[6][88][2] = 9389 b[6][88][1] = 9390 b[6][88][0] = 9391 
c    b[6][89][2] = 9392 b[6][89][1] = 9393 b[6][89][0] = 9394 
c    b[6][90][2] = 9395 b[6][90][1] = 9396 b[6][90][0] = 9397 
c    b[6][91][2] = 9398 b[6][91][1] = 9399 b[6][91][0] = 9400 
c    b[6][92][2] = 9401 b[6][92][1] = 9402 b[6][92][0] = 9403 
c    b[6][93][2] = 9404 b[6][93][1] = 9405 b[6][93][0] = 9406 
c    b[6][94][2] = 9407 b[6][94][1] = 9408 b[6][94][0] = 9409 
c    b[6][95][2] = 9410 b[6][95][1] = 9411 b[6][95][0] = 9412 
c    b[6][96][2] = 9413 b[6][96][1] = 9414 b[6][96][0] = 9415 
c    b[6][97][2] = 9416 b[6][97][1] = 9417 b[6][97][0] = 9418 
c    b[6][98][2] = 9419 b[6][98][1] = 9420 b[6][98][0] = 9421 
c    b[6][99][2] = 9422 b[6][99][1] = 9423 b[6][99][0] = 9424 
c    b[6][100][2] = 9425 b[6][100][1] = 9426 b[6][100][0] = 9427 
c    b[6][101][2] = 9428 b[6][101][1] = 9429 b[6][101][0] = 9430 
c    b[6][102][2] = 9431 b[6][102][1] = 9432 b[6][102][0] = 9433 
c    b[6][103][2] = 9434 b[6][103][1] = 9435 b[6][103][0] = 9436 
c    b[6][104][2] = 9437 b[6][104][1] = 9438 b[6][104][0] = 9439 
c    b[6][105][2] = 9440 b[6][105][1] = 9441 b[6][105][0] = 9442 
c    b[6][106][2] = 9443 b[6][106][1] = 9444 b[6][106][0] = 9445 
c    b[6][107][2] = 9446 b[6][107][1] = 9447 b[6][107][0] = 9448 
c    b[6][108][2] = 9449 b[6][108][1] = 9450 b[6][108][0] = 9451 
c    b[6][109][2] = 9452 b[6][109][1] = 9453 b[6][109][0] = 9454 
c    b[6][110][2] = 9455 b[6][110][1] = 9456 b[6][110][0] = 9457 
c    b[6][111][2] = 9458 b[6][111][1] = 9459 b[6][111][0] = 9460 
c    b[6][112][2] = 9461 b[6][112][1] = 9462 b[6][112][0] = 9463 
c    b[6][113][2] = 9464 b[6][113][1] = 9465 b[6][113][0] = 9466 
c    b[6][114][2] = 9467 b[6][114][1] = 9468 b[6][114][0] = 9469 
c    b[6][115][2] = 9470 b[6][115][1] = 9471 b[6][115][0] = 9472 
c    b[6][116][2] = 9473 b[6][116][1] = 9474 b[6][116][0] = 9475 
c    b[6][117][2] = 9476 b[6][117][1] = 9477 b[6][117][0] = 9478 
c    b[6][118][2] = 9479 b[6][118][1] = 9480 b[6][118][0] = 9481 
c    b[6][119][2] = 9482 b[6][119][1] = 9483 b[6][119][0] = 9484 
c    b[6][120][2] = 9485 b[6][120][1] = 9486 b[6][120][0] = 9487 
c    b[6][121][2] = 9488 b[6][121][1] = 9489 b[6][121][0] = 9490 
c    b[6][122][2] = 9491 b[6][122][1] = 9492 b[6][122][0] = 9493 
c    b[6][123][2] = 9494 b[6][123][1] = 9495 b[6][123][0] = 9496 
c    b[6][124][2] = 9497 b[6][124][1] = 9498 b[6][124][0] = 9499 
c    b[6][125][2] = 9500 b[6][125][1] = 9501 b[6][125][0] = 9502 
c    b[6][126][2] = 9503 b[6][126][1] = 9504 b[6][126][0] = 9505 
c    b[6][127][2] = 9506 b[6][127][1] = 9507 b[6][127][0] = 9508 
c    b[6][128][2] = 9509 b[6][128][1] = 9510 b[6][128][0] = 9511 
c    b[6][129][2] = 9512 b[6][129][1] = 9513 b[6][129][0] = 9514 
c    b[6][130][2] = 9515 b[6][130][1] = 9516 b[6][130][0] = 9517 
c    b[6][131][2] = 9518 b[6][131][1] = 9519 b[6][131][0] = 9520 
c    b[6][132][2] = 9521 b[6][132][1] = 9522 b[6][132][0] = 9523 
c    b[6][133][2] = 9524 b[6][133][1] = 9525 b[6][133][0] = 9526 
c    b[6][134][2] = 9527 b[6][134][1] = 9528 b[6][134][0] = 9529 
c    b[6][135][2] = 9530 b[6][135][1] = 9531 b[6][135][0] = 9532 
c    b[6][136][2] = 9533 b[6][136][1] = 9534 b[6][136][0] = 9535 
c    b[6][137][2] = 9536 b[6][137][1] = 9537 b[6][137][0] = 9538 
c    b[6][138][2] = 9539 b[6][138][1] = 9540 b[6][138][0] = 9541 
c    b[6][139][2] = 9542 b[6][139][1] = 9543 b[6][139][0] = 9544 
c    b[6][140][2] = 9545 b[6][140][1] = 9546 b[6][140][0] = 9547 
c    b[6][141][2] = 9548 b[6][141][1] = 9549 b[6][141][0] = 9550 
c    b[6][142][2] = 9551 b[6][142][1] = 9552 b[6][142][0] = 9553 
c    b[6][143][2] = 9554 b[6][143][1] = 9555 b[6][143][0] = 9556 
c    b[6][144][2] = 9557 b[6][144][1] = 9558 b[6][144][0] = 9559 
c    b[6][145][2] = 9560 b[6][145][1] = 9561 b[6][145][0] = 9562 
c    b[6][146][2] = 9563 b[6][146][1] = 9564 b[6][146][0] = 9565 
c    b[6][147][2] = 9566 b[6][147][1] = 9567 b[6][147][0] = 9568 
c    b[6][148][2] = 9569 b[6][148][1] = 9570 b[6][148][0] = 9571 
c    b[6][149][2] = 9572 b[6][149][1] = 9573 b[6][149][0] = 9574 
c    b[6][150][2] = 9575 b[6][150][1] = 9576 b[6][150][0] = 9577 
c    b[6][151][2] = 9578 b[6][151][1] = 9579 b[6][151][0] = 9580 
c    b[6][152][2] = 9581 b[6][152][1] = 9582 b[6][152][0] = 9583 
c    b[6][153][2] = 9584 b[6][153][1] = 9585 b[6][153][0] = 9586 
c    b[6][154][2] = 9587 b[6][154][1] = 9588 b[6][154][0] = 9589 
c    b[6][155][2] = 9590 b[6][155][1] = 9591 b[6][155][0] = 9592 
c    b[6][156][2] = 9593 b[6][156][1] = 9594 b[6][156][0] = 9595 
c    b[6][157][2] = 9596 b[6][157][1] = 9597 b[6][157][0] = 9598 
c    b[6][158][2] = 9599 b[6][158][1] = 9600 b[6][158][0] = 9601 
c    b[6][159][2] = 9602 b[6][159][1] = 9603 b[6][159][0] = 9604 
c    b[6][160][2] = 9605 b[6][160][1] = 9606 b[6][160][0] = 9607 
c    b[6][161][2] = 9608 b[6][161][1] = 9609 b[6][161][0] = 9610 
c    b[6][162][2] = 9611 b[6][162][1] = 9612 b[6][162][0] = 9613 
c    b[6][163][2] = 9614 b[6][163][1] = 9615 b[6][163][0] = 9616 
c    b[6][164][2] = 9617 b[6][164][1] = 9618 b[6][164][0] = 9619 
c    b[6][165][2] = 9620 b[6][165][1] = 9621 b[6][165][0] = 9622 
c    b[6][166][2] = 9623 b[6][166][1] = 9624 b[6][166][0] = 9625 
c    b[6][167][2] = 9626 b[6][167][1] = 9627 b[6][167][0] = 9628 
c    b[6][168][2] = 9629 b[6][168][1] = 9630 b[6][168][0] = 9631 
c    b[6][169][2] = 9632 b[6][169][1] = 9633 b[6][169][0] = 9634 
c    b[6][170][2] = 9635 b[6][170][1] = 9636 b[6][170][0] = 9637 
c    b[6][171][2] = 9638 b[6][171][1] = 9639 b[6][171][0] = 9640 
c    b[6][172][2] = 9641 b[6][172][1] = 9642 b[6][172][0] = 9643 
c    b[6][173][2] = 9644 b[6][173][1] = 9645 b[6][173][0] = 9646 
c    b[6][174][2] = 9647 b[6][174][1] = 9648 b[6][174][0] = 9649 
c    b[6][175][2] = 9650 b[6][175][1] = 9651 b[6][175][0] = 9652 
c    b[6][176][2] = 9653 b[6][176][1] = 9654 b[6][176][0] = 9655 
c    b[6][177][2] = 9656 b[6][177][1] = 9657 b[6][177][0] = 9658 
c    b[6][178][2] = 9659 b[6][178][1] = 9660 b[6][178][0] = 9661 
c    b[6][179][2] = 9662 b[6][179][1] = 9663 b[6][179][0] = 9664 
c    b[6][180][2] = 9665 b[6][180][1] = 9666 b[6][180][0] = 9667 
c    b[6][181][2] = 9668 b[6][181][1] = 9669 b[6][181][0] = 9670 
c    b[6][182][2] = 9671 b[6][182][1] = 9672 b[6][182][0] = 9673 
c    b[6][183][2] = 9674 b[6][183][1] = 9675 b[6][183][0] = 9676 
c    b[6][184][2] = 9677 b[6][184][1] = 9678 b[6][184][0] = 9679 
c    b[6][185][2] = 9680 b[6][185][1] = 9681 b[6][185][0] = 9682 
c    b[6][186][2] = 9683 b[6][186][1] = 9684 b[6][186][0] = 9685 
c    b[6][187][2] = 9686 b[6][187][1] = 9687 b[6][187][0] = 9688 
c    b[6][188][2] = 9689 b[6][188][1] = 9690 b[6][188][0] = 9691 
c    b[6][189][2] = 9692 b[6][189][1] = 9693 b[6][189][0] = 9694 
c    b[6][190][2] = 9695 b[6][190][1] = 9696 b[6][190][0] = 9697 
c    b[6][191][2] = 9698 b[6][191][1] = 9699 b[6][191][0] = 9700 
c    b[6][192][2] = 9701 b[6][192][1] = 9702 b[6][192][0] = 9703 
c    b[6][193][2] = 9704 b[6][193][1] = 9705 b[6][193][0] = 9706 
c    b[6][194][2] = 9707 b[6][194][1] = 9708 b[6][194][0] = 9709 

c    b[7][1][2] = 9710 b[7][1][1] = 9711 b[7][1][0] = 9712 
c    b[7][2][2] = 9713 b[7][2][1] = 9714 b[7][2][0] = 9715 
c    b[7][3][2] = 9716 b[7][3][1] = 9717 b[7][3][0] = 9718 
c    b[7][4][2] = 9719 b[7][4][1] = 9720 b[7][4][0] = 9721 
c    b[7][5][2] = 9722 b[7][5][1] = 9723 b[7][5][0] = 9724 
c    b[7][6][2] = 9725 b[7][6][1] = 9726 b[7][6][0] = 9727 
c    b[7][7][2] = 9728 b[7][7][1] = 9729 b[7][7][0] = 9730 
c    b[7][8][2] = 9731 b[7][8][1] = 9732 b[7][8][0] = 9733 
c    b[7][9][2] = 9734 b[7][9][1] = 9735 b[7][9][0] = 9736 
c    b[7][10][2] = 9737 b[7][10][1] = 9738 b[7][10][0] = 9739 
c    b[7][11][2] = 9740 b[7][11][1] = 9741 b[7][11][0] = 9742 
c    b[7][12][2] = 9743 b[7][12][1] = 9744 b[7][12][0] = 9745 
c    b[7][13][2] = 9746 b[7][13][1] = 9747 b[7][13][0] = 9748 
c    b[7][14][2] = 9749 b[7][14][1] = 9750 b[7][14][0] = 9751 
c    b[7][15][2] = 9752 b[7][15][1] = 9753 b[7][15][0] = 9754 
c    b[7][16][2] = 9755 b[7][16][1] = 9756 b[7][16][0] = 9757 
c    b[7][17][2] = 9758 b[7][17][1] = 9759 b[7][17][0] = 9760 
c    b[7][18][2] = 9761 b[7][18][1] = 9762 b[7][18][0] = 9763 
c    b[7][19][2] = 9764 b[7][19][1] = 9765 b[7][19][0] = 9766 
c    b[7][20][2] = 9767 b[7][20][1] = 9768 b[7][20][0] = 9769 
c    b[7][21][2] = 9770 b[7][21][1] = 9771 b[7][21][0] = 9772 
c    b[7][22][2] = 9773 b[7][22][1] = 9774 b[7][22][0] = 9775 
c    b[7][23][2] = 9776 b[7][23][1] = 9777 b[7][23][0] = 9778 
c    b[7][24][2] = 9779 b[7][24][1] = 9780 b[7][24][0] = 9781 
c    b[7][25][2] = 9782 b[7][25][1] = 9783 b[7][25][0] = 9784 
c    b[7][26][2] = 9785 b[7][26][1] = 9786 b[7][26][0] = 9787 
c    b[7][27][2] = 9788 b[7][27][1] = 9789 b[7][27][0] = 9790 
c    b[7][28][2] = 9791 b[7][28][1] = 9792 b[7][28][0] = 9793 
c    b[7][29][2] = 9794 b[7][29][1] = 9795 b[7][29][0] = 9796 
c    b[7][30][2] = 9797 b[7][30][1] = 9798 b[7][30][0] = 9799 
c    b[7][31][2] = 9800 b[7][31][1] = 9801 b[7][31][0] = 9802 
c    b[7][32][2] = 9803 b[7][32][1] = 9804 b[7][32][0] = 9805 
c    b[7][33][2] = 9806 b[7][33][1] = 9807 b[7][33][0] = 9808 
c    b[7][34][2] = 9809 b[7][34][1] = 9810 b[7][34][0] = 9811 
c    b[7][35][2] = 9812 b[7][35][1] = 9813 b[7][35][0] = 9814 
c    b[7][36][2] = 9815 b[7][36][1] = 9816 b[7][36][0] = 9817 
c    b[7][37][2] = 9818 b[7][37][1] = 9819 b[7][37][0] = 9820 
c    b[7][38][2] = 9821 b[7][38][1] = 9822 b[7][38][0] = 9823 
c    b[7][39][2] = 9824 b[7][39][1] = 9825 b[7][39][0] = 9826 
c    b[7][40][2] = 9827 b[7][40][1] = 9828 b[7][40][0] = 9829 
c    b[7][41][2] = 9830 b[7][41][1] = 9831 b[7][41][0] = 9832 
c    b[7][42][2] = 9833 b[7][42][1] = 9834 b[7][42][0] = 9835 
c    b[7][43][2] = 9836 b[7][43][1] = 9837 b[7][43][0] = 9838 
c    b[7][44][2] = 9839 b[7][44][1] = 9840 b[7][44][0] = 9841 
c    b[7][45][2] = 9842 b[7][45][1] = 9843 b[7][45][0] = 9844 
c    b[7][46][2] = 9845 b[7][46][1] = 9846 b[7][46][0] = 9847 
c    b[7][47][2] = 9848 b[7][47][1] = 9849 b[7][47][0] = 9850 
c    b[7][48][2] = 9851 b[7][48][1] = 9852 b[7][48][0] = 9853 
c    b[7][49][2] = 9854 b[7][49][1] = 9855 b[7][49][0] = 9856 
c    b[7][50][2] = 9857 b[7][50][1] = 9858 b[7][50][0] = 9859 
c    b[7][51][2] = 9860 b[7][51][1] = 9861 b[7][51][0] = 9862 
c    b[7][52][2] = 9863 b[7][52][1] = 9864 b[7][52][0] = 9865 
c    b[7][53][2] = 9866 b[7][53][1] = 9867 b[7][53][0] = 9868 
c    b[7][54][2] = 9869 b[7][54][1] = 9870 b[7][54][0] = 9871 
c    b[7][55][2] = 9872 b[7][55][1] = 9873 b[7][55][0] = 9874 
c    b[7][56][2] = 9875 b[7][56][1] = 9876 b[7][56][0] = 9877 
c    b[7][57][2] = 9878 b[7][57][1] = 9879 b[7][57][0] = 9880 
c    b[7][58][2] = 9881 b[7][58][1] = 9882 b[7][58][0] = 9883 
c    b[7][59][2] = 9884 b[7][59][1] = 9885 b[7][59][0] = 9886 
c    b[7][60][2] = 9887 b[7][60][1] = 9888 b[7][60][0] = 9889 
c    b[7][61][2] = 9890 b[7][61][1] = 9891 b[7][61][0] = 9892 
c    b[7][62][2] = 9893 b[7][62][1] = 9894 b[7][62][0] = 9895 
c    b[7][63][2] = 9896 b[7][63][1] = 9897 b[7][63][0] = 9898 
c    b[7][64][2] = 9899 b[7][64][1] = 9900 b[7][64][0] = 9901 
c    b[7][65][2] = 9902 b[7][65][1] = 9903 b[7][65][0] = 9904 
c    b[7][66][2] = 9905 b[7][66][1] = 9906 b[7][66][0] = 9907 
c    b[7][67][2] = 9908 b[7][67][1] = 9909 b[7][67][0] = 9910 
c    b[7][68][2] = 9911 b[7][68][1] = 9912 b[7][68][0] = 9913 
c    b[7][69][2] = 9914 b[7][69][1] = 9915 b[7][69][0] = 9916 
c    b[7][70][2] = 9917 b[7][70][1] = 9918 b[7][70][0] = 9919 
c    b[7][71][2] = 9920 b[7][71][1] = 9921 b[7][71][0] = 9922 
c    b[7][72][2] = 9923 b[7][72][1] = 9924 b[7][72][0] = 9925 
c    b[7][73][2] = 9926 b[7][73][1] = 9927 b[7][73][0] = 9928 
c    b[7][74][2] = 9929 b[7][74][1] = 9930 b[7][74][0] = 9931 
c    b[7][75][2] = 9932 b[7][75][1] = 9933 b[7][75][0] = 9934 
c    b[7][76][2] = 9935 b[7][76][1] = 9936 b[7][76][0] = 9937 
c    b[7][77][2] = 9938 b[7][77][1] = 9939 b[7][77][0] = 9940 
c    b[7][78][2] = 9941 b[7][78][1] = 9942 b[7][78][0] = 9943 
c    b[7][79][2] = 9944 b[7][79][1] = 9945 b[7][79][0] = 9946 
c    b[7][80][2] = 9947 b[7][80][1] = 9948 b[7][80][0] = 9949 
c    b[7][81][2] = 9950 b[7][81][1] = 9951 b[7][81][0] = 9952 
c    b[7][82][2] = 9953 b[7][82][1] = 9954 b[7][82][0] = 9955 
c    b[7][83][2] = 9956 b[7][83][1] = 9957 b[7][83][0] = 9958 
c    b[7][84][2] = 9959 b[7][84][1] = 9960 b[7][84][0] = 9961 
c    b[7][85][2] = 9962 b[7][85][1] = 9963 b[7][85][0] = 9964 
c    b[7][86][2] = 9965 b[7][86][1] = 9966 b[7][86][0] = 9967 
c    b[7][87][2] = 9968 b[7][87][1] = 9969 b[7][87][0] = 9970 
c    b[7][88][2] = 9971 b[7][88][1] = 9972 b[7][88][0] = 9973 
c    b[7][89][2] = 9974 b[7][89][1] = 9975 b[7][89][0] = 9976 
c    b[7][90][2] = 9977 b[7][90][1] = 9978 b[7][90][0] = 9979 
c    b[7][91][2] = 9980 b[7][91][1] = 9981 b[7][91][0] = 9982 
c    b[7][92][2] = 9983 b[7][92][1] = 9984 b[7][92][0] = 9985 
c    b[7][93][2] = 9986 b[7][93][1] = 9987 b[7][93][0] = 9988 
c    b[7][94][2] = 9989 b[7][94][1] = 9990 b[7][94][0] = 9991 
c    b[7][95][2] = 9992 b[7][95][1] = 9993 b[7][95][0] = 9994 
c    b[7][96][2] = 9995 b[7][96][1] = 9996 b[7][96][0] = 9997 
c    b[7][97][2] = 9998 b[7][97][1] = 9999 b[7][97][0] = 10000 
c    b[7][98][2] = 10001 b[7][98][1] = 10002 b[7][98][0] = 10003 
c    b[7][99][2] = 10004 b[7][99][1] = 10005 b[7][99][0] = 10006 
c    b[7][100][2] = 10007 b[7][100][1] = 10008 b[7][100][0] = 10009 
c    b[7][101][2] = 10010 b[7][101][1] = 10011 b[7][101][0] = 10012 
c    b[7][102][2] = 10013 b[7][102][1] = 10014 b[7][102][0] = 10015 
c    b[7][103][2] = 10016 b[7][103][1] = 10017 b[7][103][0] = 10018 
c    b[7][104][2] = 10019 b[7][104][1] = 10020 b[7][104][0] = 10021 
c    b[7][105][2] = 10022 b[7][105][1] = 10023 b[7][105][0] = 10024 
c    b[7][106][2] = 10025 b[7][106][1] = 10026 b[7][106][0] = 10027 
c    b[7][107][2] = 10028 b[7][107][1] = 10029 b[7][107][0] = 10030 
c    b[7][108][2] = 10031 b[7][108][1] = 10032 b[7][108][0] = 10033 
c    b[7][109][2] = 10034 b[7][109][1] = 10035 b[7][109][0] = 10036 
c    b[7][110][2] = 10037 b[7][110][1] = 10038 b[7][110][0] = 10039 
c    b[7][111][2] = 10040 b[7][111][1] = 10041 b[7][111][0] = 10042 
c    b[7][112][2] = 10043 b[7][112][1] = 10044 b[7][112][0] = 10045 
c    b[7][113][2] = 10046 b[7][113][1] = 10047 b[7][113][0] = 10048 
c    b[7][114][2] = 10049 b[7][114][1] = 10050 b[7][114][0] = 10051 
c    b[7][115][2] = 10052 b[7][115][1] = 10053 b[7][115][0] = 10054 
c    b[7][116][2] = 10055 b[7][116][1] = 10056 b[7][116][0] = 10057 
c    b[7][117][2] = 10058 b[7][117][1] = 10059 b[7][117][0] = 10060 
c    b[7][118][2] = 10061 b[7][118][1] = 10062 b[7][118][0] = 10063 
c    b[7][119][2] = 10064 b[7][119][1] = 10065 b[7][119][0] = 10066 
c    b[7][120][2] = 10067 b[7][120][1] = 10068 b[7][120][0] = 10069 
c    b[7][121][2] = 10070 b[7][121][1] = 10071 b[7][121][0] = 10072 
c    b[7][122][2] = 10073 b[7][122][1] = 10074 b[7][122][0] = 10075 
c    b[7][123][2] = 10076 b[7][123][1] = 10077 b[7][123][0] = 10078 
c    b[7][124][2] = 10079 b[7][124][1] = 10080 b[7][124][0] = 10081 
c    b[7][125][2] = 10082 b[7][125][1] = 10083 b[7][125][0] = 10084 
c    b[7][126][2] = 10085 b[7][126][1] = 10086 b[7][126][0] = 10087 
c    b[7][127][2] = 10088 b[7][127][1] = 10089 b[7][127][0] = 10090 
c    b[7][128][2] = 10091 b[7][128][1] = 10092 b[7][128][0] = 10093 
c    b[7][129][2] = 10094 b[7][129][1] = 10095 b[7][129][0] = 10096 
c    b[7][130][2] = 10097 b[7][130][1] = 10098 b[7][130][0] = 10099 
c    b[7][131][2] = 10100 b[7][131][1] = 10101 b[7][131][0] = 10102 
c    b[7][132][2] = 10103 b[7][132][1] = 10104 b[7][132][0] = 10105 
c    b[7][133][2] = 10106 b[7][133][1] = 10107 b[7][133][0] = 10108 
c    b[7][134][2] = 10109 b[7][134][1] = 10110 b[7][134][0] = 10111 
c    b[7][135][2] = 10112 b[7][135][1] = 10113 b[7][135][0] = 10114 
c    b[7][136][2] = 10115 b[7][136][1] = 10116 b[7][136][0] = 10117 
c    b[7][137][2] = 10118 b[7][137][1] = 10119 b[7][137][0] = 10120 
c    b[7][138][2] = 10121 b[7][138][1] = 10122 b[7][138][0] = 10123 
c    b[7][139][2] = 10124 b[7][139][1] = 10125 b[7][139][0] = 10126 
c    b[7][140][2] = 10127 b[7][140][1] = 10128 b[7][140][0] = 10129 
c    b[7][141][2] = 10130 b[7][141][1] = 10131 b[7][141][0] = 10132 
c    b[7][142][2] = 10133 b[7][142][1] = 10134 b[7][142][0] = 10135 
c    b[7][143][2] = 10136 b[7][143][1] = 10137 b[7][143][0] = 10138 
c    b[7][144][2] = 10139 b[7][144][1] = 10140 b[7][144][0] = 10141 
c    b[7][145][2] = 10142 b[7][145][1] = 10143 b[7][145][0] = 10144 
c    b[7][146][2] = 10145 b[7][146][1] = 10146 b[7][146][0] = 10147 
c    b[7][147][2] = 10148 b[7][147][1] = 10149 b[7][147][0] = 10150 
c    b[7][148][2] = 10151 b[7][148][1] = 10152 b[7][148][0] = 10153 
c    b[7][149][2] = 10154 b[7][149][1] = 10155 b[7][149][0] = 10156 
c    b[7][150][2] = 10157 b[7][150][1] = 10158 b[7][150][0] = 10159 
c    b[7][151][2] = 10160 b[7][151][1] = 10161 b[7][151][0] = 10162 
c    b[7][152][2] = 10163 b[7][152][1] = 10164 b[7][152][0] = 10165 
c    b[7][153][2] = 10166 b[7][153][1] = 10167 b[7][153][0] = 10168 
c    b[7][154][2] = 10169 b[7][154][1] = 10170 b[7][154][0] = 10171 
c    b[7][155][2] = 10172 b[7][155][1] = 10173 b[7][155][0] = 10174 
c    b[7][156][2] = 10175 b[7][156][1] = 10176 b[7][156][0] = 10177 
c    b[7][157][2] = 10178 b[7][157][1] = 10179 b[7][157][0] = 10180 
c    b[7][158][2] = 10181 b[7][158][1] = 10182 b[7][158][0] = 10183 
c    b[7][159][2] = 10184 b[7][159][1] = 10185 b[7][159][0] = 10186 
c    b[7][160][2] = 10187 b[7][160][1] = 10188 b[7][160][0] = 10189 
c    b[7][161][2] = 10190 b[7][161][1] = 10191 b[7][161][0] = 10192 
c    b[7][162][2] = 10193 b[7][162][1] = 10194 b[7][162][0] = 10195 
c    b[7][163][2] = 10196 b[7][163][1] = 10197 b[7][163][0] = 10198 
c    b[7][164][2] = 10199 b[7][164][1] = 10200 b[7][164][0] = 10201 
c    b[7][165][2] = 10202 b[7][165][1] = 10203 b[7][165][0] = 10204 
c    b[7][166][2] = 10205 b[7][166][1] = 10206 b[7][166][0] = 10207 

c    b[8][1][2] = 10208 b[8][1][1] = 10209 b[8][1][0] = 10210 
c    b[8][2][2] = 10211 b[8][2][1] = 10212 b[8][2][0] = 10213 
c    b[8][3][2] = 10214 b[8][3][1] = 10215 b[8][3][0] = 10216 
c    b[8][4][2] = 10217 b[8][4][1] = 10218 b[8][4][0] = 10219 
c    b[8][5][2] = 10220 b[8][5][1] = 10221 b[8][5][0] = 10222 
c    b[8][6][2] = 10223 b[8][6][1] = 10224 b[8][6][0] = 10225 
c    b[8][7][2] = 10226 b[8][7][1] = 10227 b[8][7][0] = 10228 
c    b[8][8][2] = 10229 b[8][8][1] = 10230 b[8][8][0] = 10231 
c    b[8][9][2] = 10232 b[8][9][1] = 10233 b[8][9][0] = 10234 
c    b[8][10][2] = 10235 b[8][10][1] = 10236 b[8][10][0] = 10237 
c    b[8][11][2] = 10238 b[8][11][1] = 10239 b[8][11][0] = 10240 
c    b[8][12][2] = 10241 b[8][12][1] = 10242 b[8][12][0] = 10243 
c    b[8][13][2] = 10244 b[8][13][1] = 10245 b[8][13][0] = 10246 
c    b[8][14][2] = 10247 b[8][14][1] = 10248 b[8][14][0] = 10249 
c    b[8][15][2] = 10250 b[8][15][1] = 10251 b[8][15][0] = 10252 
c    b[8][16][2] = 10253 b[8][16][1] = 10254 b[8][16][0] = 10255 
c    b[8][17][2] = 10256 b[8][17][1] = 10257 b[8][17][0] = 10258 
c    b[8][18][2] = 10259 b[8][18][1] = 10260 b[8][18][0] = 10261 
c    b[8][19][2] = 10262 b[8][19][1] = 10263 b[8][19][0] = 10264 
c    b[8][20][2] = 10265 b[8][20][1] = 10266 b[8][20][0] = 10267 
c    b[8][21][2] = 10268 b[8][21][1] = 10269 b[8][21][0] = 10270 
c    b[8][22][2] = 10271 b[8][22][1] = 10272 b[8][22][0] = 10273 
c    b[8][23][2] = 10274 b[8][23][1] = 10275 b[8][23][0] = 10276 
c    b[8][24][2] = 10277 b[8][24][1] = 10278 b[8][24][0] = 10279 
c    b[8][25][2] = 10280 b[8][25][1] = 10281 b[8][25][0] = 10282 
c    b[8][26][2] = 10283 b[8][26][1] = 10284 b[8][26][0] = 10285 
c    b[8][27][2] = 10286 b[8][27][1] = 10287 b[8][27][0] = 10288 
c    b[8][28][2] = 10289 b[8][28][1] = 10290 b[8][28][0] = 10291 
c    b[8][29][2] = 10292 b[8][29][1] = 10293 b[8][29][0] = 10294 
c    b[8][30][2] = 10295 b[8][30][1] = 10296 b[8][30][0] = 10297 
c    b[8][31][2] = 10298 b[8][31][1] = 10299 b[8][31][0] = 10300 
c    b[8][32][2] = 10301 b[8][32][1] = 10302 b[8][32][0] = 10303 
c    b[8][33][2] = 10304 b[8][33][1] = 10305 b[8][33][0] = 10306 
c    b[8][34][2] = 10307 b[8][34][1] = 10308 b[8][34][0] = 10309 
c    b[8][35][2] = 10310 b[8][35][1] = 10311 b[8][35][0] = 10312 
c    b[8][36][2] = 10313 b[8][36][1] = 10314 b[8][36][0] = 10315 
c    b[8][37][2] = 10316 b[8][37][1] = 10317 b[8][37][0] = 10318 
c    b[8][38][2] = 10319 b[8][38][1] = 10320 b[8][38][0] = 10321 
c    b[8][39][2] = 10322 b[8][39][1] = 10323 b[8][39][0] = 10324 
c    b[8][40][2] = 10325 b[8][40][1] = 10326 b[8][40][0] = 10327 
c    b[8][41][2] = 10328 b[8][41][1] = 10329 b[8][41][0] = 10330 
c    b[8][42][2] = 10331 b[8][42][1] = 10332 b[8][42][0] = 10333 
c    b[8][43][2] = 10334 b[8][43][1] = 10335 b[8][43][0] = 10336 
c    b[8][44][2] = 10337 b[8][44][1] = 10338 b[8][44][0] = 10339 
c    b[8][45][2] = 10340 b[8][45][1] = 10341 b[8][45][0] = 10342 
c    b[8][46][2] = 10343 b[8][46][1] = 10344 b[8][46][0] = 10345 
c    b[8][47][2] = 10346 b[8][47][1] = 10347 b[8][47][0] = 10348 
c    b[8][48][2] = 10349 b[8][48][1] = 10350 b[8][48][0] = 10351 
c    b[8][49][2] = 10352 b[8][49][1] = 10353 b[8][49][0] = 10354 
c    b[8][50][2] = 10355 b[8][50][1] = 10356 b[8][50][0] = 10357 
c    b[8][51][2] = 10358 b[8][51][1] = 10359 b[8][51][0] = 10360 
c    b[8][52][2] = 10361 b[8][52][1] = 10362 b[8][52][0] = 10363 
c    b[8][53][2] = 10364 b[8][53][1] = 10365 b[8][53][0] = 10366 
c    b[8][54][2] = 10367 b[8][54][1] = 10368 b[8][54][0] = 10369 
c    b[8][55][2] = 10370 b[8][55][1] = 10371 b[8][55][0] = 10372 
c    b[8][56][2] = 10373 b[8][56][1] = 10374 b[8][56][0] = 10375 
c    b[8][57][2] = 10376 b[8][57][1] = 10377 b[8][57][0] = 10378 
c    b[8][58][2] = 10379 b[8][58][1] = 10380 b[8][58][0] = 10381 
c    b[8][59][2] = 10382 b[8][59][1] = 10383 b[8][59][0] = 10384 
c    b[8][60][2] = 10385 b[8][60][1] = 10386 b[8][60][0] = 10387 
c    b[8][61][2] = 10388 b[8][61][1] = 10389 b[8][61][0] = 10390 
c    b[8][62][2] = 10391 b[8][62][1] = 10392 b[8][62][0] = 10393 
c    b[8][63][2] = 10394 b[8][63][1] = 10395 b[8][63][0] = 10396 
c    b[8][64][2] = 10397 b[8][64][1] = 10398 b[8][64][0] = 10399 
c    b[8][65][2] = 10400 b[8][65][1] = 10401 b[8][65][0] = 10402 
c    b[8][66][2] = 10403 b[8][66][1] = 10404 b[8][66][0] = 10405 
c    b[8][67][2] = 10406 b[8][67][1] = 10407 b[8][67][0] = 10408 
c    b[8][68][2] = 10409 b[8][68][1] = 10410 b[8][68][0] = 10411 
c    b[8][69][2] = 10412 b[8][69][1] = 10413 b[8][69][0] = 10414 
c    b[8][70][2] = 10415 b[8][70][1] = 10416 b[8][70][0] = 10417 
c    b[8][71][2] = 10418 b[8][71][1] = 10419 b[8][71][0] = 10420 
c    b[8][72][2] = 10421 b[8][72][1] = 10422 b[8][72][0] = 10423 
c    b[8][73][2] = 10424 b[8][73][1] = 10425 b[8][73][0] = 10426 
c    b[8][74][2] = 10427 b[8][74][1] = 10428 b[8][74][0] = 10429 
c    b[8][75][2] = 10430 b[8][75][1] = 10431 b[8][75][0] = 10432 
c    b[8][76][2] = 10433 b[8][76][1] = 10434 b[8][76][0] = 10435 
c    b[8][77][2] = 10436 b[8][77][1] = 10437 b[8][77][0] = 10438 
c    b[8][78][2] = 10439 b[8][78][1] = 10440 b[8][78][0] = 10441 
c    b[8][79][2] = 10442 b[8][79][1] = 10443 b[8][79][0] = 10444 
c    b[8][80][2] = 10445 b[8][80][1] = 10446 b[8][80][0] = 10447 
c    b[8][81][2] = 10448 b[8][81][1] = 10449 b[8][81][0] = 10450 
c    b[8][82][2] = 10451 b[8][82][1] = 10452 b[8][82][0] = 10453 
c    b[8][83][2] = 10454 b[8][83][1] = 10455 b[8][83][0] = 10456 
c    b[8][84][2] = 10457 b[8][84][1] = 10458 b[8][84][0] = 10459 
c    b[8][85][2] = 10460 b[8][85][1] = 10461 b[8][85][0] = 10462 
c    b[8][86][2] = 10463 b[8][86][1] = 10464 b[8][86][0] = 10465 
c    b[8][87][2] = 10466 b[8][87][1] = 10467 b[8][87][0] = 10468 
c    b[8][88][2] = 10469 b[8][88][1] = 10470 b[8][88][0] = 10471 
c    b[8][89][2] = 10472 b[8][89][1] = 10473 b[8][89][0] = 10474 
c    b[8][90][2] = 10475 b[8][90][1] = 10476 b[8][90][0] = 10477 
c    b[8][91][2] = 10478 b[8][91][1] = 10479 b[8][91][0] = 10480 
c    b[8][92][2] = 10481 b[8][92][1] = 10482 b[8][92][0] = 10483 
c    b[8][93][2] = 10484 b[8][93][1] = 10485 b[8][93][0] = 10486 
c    b[8][94][2] = 10487 b[8][94][1] = 10488 b[8][94][0] = 10489 
c    b[8][95][2] = 10490 b[8][95][1] = 10491 b[8][95][0] = 10492 
c    b[8][96][2] = 10493 b[8][96][1] = 10494 b[8][96][0] = 10495 
c    b[8][97][2] = 10496 b[8][97][1] = 10497 b[8][97][0] = 10498 
c    b[8][98][2] = 10499 b[8][98][1] = 10500 b[8][98][0] = 10501 
c    b[8][99][2] = 10502 b[8][99][1] = 10503 b[8][99][0] = 10504 
c    b[8][100][2] = 10505 b[8][100][1] = 10506 b[8][100][0] = 10507 
c    b[8][101][2] = 10508 b[8][101][1] = 10509 b[8][101][0] = 10510 
c    b[8][102][2] = 10511 b[8][102][1] = 10512 b[8][102][0] = 10513 
c    b[8][103][2] = 10514 b[8][103][1] = 10515 b[8][103][0] = 10516 
c    b[8][104][2] = 10517 b[8][104][1] = 10518 b[8][104][0] = 10519 
c    b[8][105][2] = 10520 b[8][105][1] = 10521 b[8][105][0] = 10522 
c    b[8][106][2] = 10523 b[8][106][1] = 10524 b[8][106][0] = 10525 
c    b[8][107][2] = 10526 b[8][107][1] = 10527 b[8][107][0] = 10528 
c    b[8][108][2] = 10529 b[8][108][1] = 10530 b[8][108][0] = 10531 
c    b[8][109][2] = 10532 b[8][109][1] = 10533 b[8][109][0] = 10534 
c    b[8][110][2] = 10535 b[8][110][1] = 10536 b[8][110][0] = 10537 
c    b[8][111][2] = 10538 b[8][111][1] = 10539 b[8][111][0] = 10540 
c    b[8][112][2] = 10541 b[8][112][1] = 10542 b[8][112][0] = 10543 
c    b[8][113][2] = 10544 b[8][113][1] = 10545 b[8][113][0] = 10546 
c    b[8][114][2] = 10547 b[8][114][1] = 10548 b[8][114][0] = 10549 
c    b[8][115][2] = 10550 b[8][115][1] = 10551 b[8][115][0] = 10552 
c    b[8][116][2] = 10553 b[8][116][1] = 10554 b[8][116][0] = 10555 
c    b[8][117][2] = 10556 b[8][117][1] = 10557 b[8][117][0] = 10558 
c    b[8][118][2] = 10559 b[8][118][1] = 10560 b[8][118][0] = 10561 
c    b[8][119][2] = 10562 b[8][119][1] = 10563 b[8][119][0] = 10564 
c    b[8][120][2] = 10565 b[8][120][1] = 10566 b[8][120][0] = 10567 
c    b[8][121][2] = 10568 b[8][121][1] = 10569 b[8][121][0] = 10570 
c    b[8][122][2] = 10571 b[8][122][1] = 10572 b[8][122][0] = 10573 
c    b[8][123][2] = 10574 b[8][123][1] = 10575 b[8][123][0] = 10576 
c    b[8][124][2] = 10577 b[8][124][1] = 10578 b[8][124][0] = 10579 
c    b[8][125][2] = 10580 b[8][125][1] = 10581 b[8][125][0] = 10582 
c    b[8][126][2] = 10583 b[8][126][1] = 10584 b[8][126][0] = 10585 
c    b[8][127][2] = 10586 b[8][127][1] = 10587 b[8][127][0] = 10588 
c    b[8][128][2] = 10589 b[8][128][1] = 10590 b[8][128][0] = 10591 
c    b[8][129][2] = 10592 b[8][129][1] = 10593 b[8][129][0] = 10594 
c    b[8][130][2] = 10595 b[8][130][1] = 10596 b[8][130][0] = 10597 
c    b[8][131][2] = 10598 b[8][131][1] = 10599 b[8][131][0] = 10600 
c    b[8][132][2] = 10601 b[8][132][1] = 10602 b[8][132][0] = 10603 
c    b[8][133][2] = 10604 b[8][133][1] = 10605 b[8][133][0] = 10606 
c    b[8][134][2] = 10607 b[8][134][1] = 10608 b[8][134][0] = 10609 
c    b[8][135][2] = 10610 b[8][135][1] = 10611 b[8][135][0] = 10612 
c    b[8][136][2] = 10613 b[8][136][1] = 10614 b[8][136][0] = 10615 
c    b[8][137][2] = 10616 b[8][137][1] = 10617 b[8][137][0] = 10618 
c    b[8][138][2] = 10619 b[8][138][1] = 10620 b[8][138][0] = 10621 
c    b[8][139][2] = 10622 b[8][139][1] = 10623 b[8][139][0] = 10624 
c    b[8][140][2] = 10625 b[8][140][1] = 10626 b[8][140][0] = 10627 
c    b[8][141][2] = 10628 b[8][141][1] = 10629 b[8][141][0] = 10630 
c    b[8][142][2] = 10631 b[8][142][1] = 10632 b[8][142][0] = 10633 
c    b[8][143][2] = 10634 b[8][143][1] = 10635 b[8][143][0] = 10636 
c    b[8][144][2] = 10637 b[8][144][1] = 10638 b[8][144][0] = 10639 
c    b[8][145][2] = 10640 b[8][145][1] = 10641 b[8][145][0] = 10642 
c    b[8][146][2] = 10643 b[8][146][1] = 10644 b[8][146][0] = 10645 

c    b[9][1][2] = 10646 b[9][1][1] = 10647 b[9][1][0] = 10648 
c    b[9][2][2] = 10649 b[9][2][1] = 10650 b[9][2][0] = 10651 
c    b[9][3][2] = 10652 b[9][3][1] = 10653 b[9][3][0] = 10654 
c    b[9][4][2] = 10655 b[9][4][1] = 10656 b[9][4][0] = 10657 
c    b[9][5][2] = 10658 b[9][5][1] = 10659 b[9][5][0] = 10660 
c    b[9][6][2] = 10661 b[9][6][1] = 10662 b[9][6][0] = 10663 
c    b[9][7][2] = 10664 b[9][7][1] = 10665 b[9][7][0] = 10666 
c    b[9][8][2] = 10667 b[9][8][1] = 10668 b[9][8][0] = 10669 
c    b[9][9][2] = 10670 b[9][9][1] = 10671 b[9][9][0] = 10672 
c    b[9][10][2] = 10673 b[9][10][1] = 10674 b[9][10][0] = 10675 
c    b[9][11][2] = 10676 b[9][11][1] = 10677 b[9][11][0] = 10678 
c    b[9][12][2] = 10679 b[9][12][1] = 10680 b[9][12][0] = 10681 
c    b[9][13][2] = 10682 b[9][13][1] = 10683 b[9][13][0] = 10684 
c    b[9][14][2] = 10685 b[9][14][1] = 10686 b[9][14][0] = 10687 
c    b[9][15][2] = 10688 b[9][15][1] = 10689 b[9][15][0] = 10690 
c    b[9][16][2] = 10691 b[9][16][1] = 10692 b[9][16][0] = 10693 
c    b[9][17][2] = 10694 b[9][17][1] = 10695 b[9][17][0] = 10696 
c    b[9][18][2] = 10697 b[9][18][1] = 10698 b[9][18][0] = 10699 
c    b[9][19][2] = 10700 b[9][19][1] = 10701 b[9][19][0] = 10702 
c    b[9][20][2] = 10703 b[9][20][1] = 10704 b[9][20][0] = 10705 
c    b[9][21][2] = 10706 b[9][21][1] = 10707 b[9][21][0] = 10708 
c    b[9][22][2] = 10709 b[9][22][1] = 10710 b[9][22][0] = 10711 
c    b[9][23][2] = 10712 b[9][23][1] = 10713 b[9][23][0] = 10714 
c    b[9][24][2] = 10715 b[9][24][1] = 10716 b[9][24][0] = 10717 
c    b[9][25][2] = 10718 b[9][25][1] = 10719 b[9][25][0] = 10720 
c    b[9][26][2] = 10721 b[9][26][1] = 10722 b[9][26][0] = 10723 
c    b[9][27][2] = 10724 b[9][27][1] = 10725 b[9][27][0] = 10726 
c    b[9][28][2] = 10727 b[9][28][1] = 10728 b[9][28][0] = 10729 
c    b[9][29][2] = 10730 b[9][29][1] = 10731 b[9][29][0] = 10732 
c    b[9][30][2] = 10733 b[9][30][1] = 10734 b[9][30][0] = 10735 
c    b[9][31][2] = 10736 b[9][31][1] = 10737 b[9][31][0] = 10738 
c    b[9][32][2] = 10739 b[9][32][1] = 10740 b[9][32][0] = 10741 
c    b[9][33][2] = 10742 b[9][33][1] = 10743 b[9][33][0] = 10744 
c    b[9][34][2] = 10745 b[9][34][1] = 10746 b[9][34][0] = 10747 
c    b[9][35][2] = 10748 b[9][35][1] = 10749 b[9][35][0] = 10750 
c    b[9][36][2] = 10751 b[9][36][1] = 10752 b[9][36][0] = 10753 
c    b[9][37][2] = 10754 b[9][37][1] = 10755 b[9][37][0] = 10756 
c    b[9][38][2] = 10757 b[9][38][1] = 10758 b[9][38][0] = 10759 
c    b[9][39][2] = 10760 b[9][39][1] = 10761 b[9][39][0] = 10762 
c    b[9][40][2] = 10763 b[9][40][1] = 10764 b[9][40][0] = 10765 
c    b[9][41][2] = 10766 b[9][41][1] = 10767 b[9][41][0] = 10768 
c    b[9][42][2] = 10769 b[9][42][1] = 10770 b[9][42][0] = 10771 
c    b[9][43][2] = 10772 b[9][43][1] = 10773 b[9][43][0] = 10774 
c    b[9][44][2] = 10775 b[9][44][1] = 10776 b[9][44][0] = 10777 
c    b[9][45][2] = 10778 b[9][45][1] = 10779 b[9][45][0] = 10780 
c    b[9][46][2] = 10781 b[9][46][1] = 10782 b[9][46][0] = 10783 
c    b[9][47][2] = 10784 b[9][47][1] = 10785 b[9][47][0] = 10786 
c    b[9][48][2] = 10787 b[9][48][1] = 10788 b[9][48][0] = 10789 
c    b[9][49][2] = 10790 b[9][49][1] = 10791 b[9][49][0] = 10792 
c    b[9][50][2] = 10793 b[9][50][1] = 10794 b[9][50][0] = 10795 
c    b[9][51][2] = 10796 b[9][51][1] = 10797 b[9][51][0] = 10798 
c    b[9][52][2] = 10799 b[9][52][1] = 10800 b[9][52][0] = 10801 
c    b[9][53][2] = 10802 b[9][53][1] = 10803 b[9][53][0] = 10804 
c    b[9][54][2] = 10805 b[9][54][1] = 10806 b[9][54][0] = 10807 
c    b[9][55][2] = 10808 b[9][55][1] = 10809 b[9][55][0] = 10810 
c    b[9][56][2] = 10811 b[9][56][1] = 10812 b[9][56][0] = 10813 
c    b[9][57][2] = 10814 b[9][57][1] = 10815 b[9][57][0] = 10816 
c    b[9][58][2] = 10817 b[9][58][1] = 10818 b[9][58][0] = 10819 
c    b[9][59][2] = 10820 b[9][59][1] = 10821 b[9][59][0] = 10822 
c    b[9][60][2] = 10823 b[9][60][1] = 10824 b[9][60][0] = 10825 
c    b[9][61][2] = 10826 b[9][61][1] = 10827 b[9][61][0] = 10828 
c    b[9][62][2] = 10829 b[9][62][1] = 10830 b[9][62][0] = 10831 
c    b[9][63][2] = 10832 b[9][63][1] = 10833 b[9][63][0] = 10834 
c    b[9][64][2] = 10835 b[9][64][1] = 10836 b[9][64][0] = 10837 
c    b[9][65][2] = 10838 b[9][65][1] = 10839 b[9][65][0] = 10840 
c    b[9][66][2] = 10841 b[9][66][1] = 10842 b[9][66][0] = 10843 
c    b[9][67][2] = 10844 b[9][67][1] = 10845 b[9][67][0] = 10846 
c    b[9][68][2] = 10847 b[9][68][1] = 10848 b[9][68][0] = 10849 
c    b[9][69][2] = 10850 b[9][69][1] = 10851 b[9][69][0] = 10852 
c    b[9][70][2] = 10853 b[9][70][1] = 10854 b[9][70][0] = 10855 
c    b[9][71][2] = 10856 b[9][71][1] = 10857 b[9][71][0] = 10858 
c    b[9][72][2] = 10859 b[9][72][1] = 10860 b[9][72][0] = 10861 
c    b[9][73][2] = 10862 b[9][73][1] = 10863 b[9][73][0] = 10864 
c    b[9][74][2] = 10865 b[9][74][1] = 10866 b[9][74][0] = 10867 
c    b[9][75][2] = 10868 b[9][75][1] = 10869 b[9][75][0] = 10870 
c    b[9][76][2] = 10871 b[9][76][1] = 10872 b[9][76][0] = 10873 
c    b[9][77][2] = 10874 b[9][77][1] = 10875 b[9][77][0] = 10876 
c    b[9][78][2] = 10877 b[9][78][1] = 10878 b[9][78][0] = 10879 
c    b[9][79][2] = 10880 b[9][79][1] = 10881 b[9][79][0] = 10882 
c    b[9][80][2] = 10883 b[9][80][1] = 10884 b[9][80][0] = 10885 
c    b[9][81][2] = 10886 b[9][81][1] = 10887 b[9][81][0] = 10888 
c    b[9][82][2] = 10889 b[9][82][1] = 10890 b[9][82][0] = 10891 
c    b[9][83][2] = 10892 b[9][83][1] = 10893 b[9][83][0] = 10894 
c    b[9][84][2] = 10895 b[9][84][1] = 10896 b[9][84][0] = 10897 
c    b[9][85][2] = 10898 b[9][85][1] = 10899 b[9][85][0] = 10900 
c    b[9][86][2] = 10901 b[9][86][1] = 10902 b[9][86][0] = 10903 
c    b[9][87][2] = 10904 b[9][87][1] = 10905 b[9][87][0] = 10906 
c    b[9][88][2] = 10907 b[9][88][1] = 10908 b[9][88][0] = 10909 
c    b[9][89][2] = 10910 b[9][89][1] = 10911 b[9][89][0] = 10912 
c    b[9][90][2] = 10913 b[9][90][1] = 10914 b[9][90][0] = 10915 
c    b[9][91][2] = 10916 b[9][91][1] = 10917 b[9][91][0] = 10918 
c    b[9][92][2] = 10919 b[9][92][1] = 10920 b[9][92][0] = 10921 
c    b[9][93][2] = 10922 b[9][93][1] = 10923 b[9][93][0] = 10924 
c    b[9][94][2] = 10925 b[9][94][1] = 10926 b[9][94][0] = 10927 
c    b[9][95][2] = 10928 b[9][95][1] = 10929 b[9][95][0] = 10930 
c    b[9][96][2] = 10931 b[9][96][1] = 10932 b[9][96][0] = 10933 
c    b[9][97][2] = 10934 b[9][97][1] = 10935 b[9][97][0] = 10936 
c    b[9][98][2] = 10937 b[9][98][1] = 10938 b[9][98][0] = 10939 
c    b[9][99][2] = 10940 b[9][99][1] = 10941 b[9][99][0] = 10942 
c    b[9][100][2] = 10943 b[9][100][1] = 10944 b[9][100][0] = 10945 
c    b[9][101][2] = 10946 b[9][101][1] = 10947 b[9][101][0] = 10948 
c    b[9][102][2] = 10949 b[9][102][1] = 10950 b[9][102][0] = 10951 
c    b[9][103][2] = 10952 b[9][103][1] = 10953 b[9][103][0] = 10954 
c    b[9][104][2] = 10955 b[9][104][1] = 10956 b[9][104][0] = 10957 
c    b[9][105][2] = 10958 b[9][105][1] = 10959 b[9][105][0] = 10960 
c    b[9][106][2] = 10961 b[9][106][1] = 10962 b[9][106][0] = 10963 
c    b[9][107][2] = 10964 b[9][107][1] = 10965 b[9][107][0] = 10966 
c    b[9][108][2] = 10967 b[9][108][1] = 10968 b[9][108][0] = 10969 
c    b[9][109][2] = 10970 b[9][109][1] = 10971 b[9][109][0] = 10972 
c    b[9][110][2] = 10973 b[9][110][1] = 10974 b[9][110][0] = 10975 
c    b[9][111][2] = 10976 b[9][111][1] = 10977 b[9][111][0] = 10978 
c    b[9][112][2] = 10979 b[9][112][1] = 10980 b[9][112][0] = 10981 
c    b[9][113][2] = 10982 b[9][113][1] = 10983 b[9][113][0] = 10984 
c    b[9][114][2] = 10985 b[9][114][1] = 10986 b[9][114][0] = 10987 
c    b[9][115][2] = 10988 b[9][115][1] = 10989 b[9][115][0] = 10990 
c    b[9][116][2] = 10991 b[9][116][1] = 10992 b[9][116][0] = 10993 
c    b[9][117][2] = 10994 b[9][117][1] = 10995 b[9][117][0] = 10996 
c    b[9][118][2] = 10997 b[9][118][1] = 10998 b[9][118][0] = 10999 
c    b[9][119][2] = 11000 b[9][119][1] = 11001 b[9][119][0] = 11002 
c    b[9][120][2] = 11003 b[9][120][1] = 11004 b[9][120][0] = 11005 
c    b[9][121][2] = 11006 b[9][121][1] = 11007 b[9][121][0] = 11008 
c    b[9][122][2] = 11009 b[9][122][1] = 11010 b[9][122][0] = 11011 
c    b[9][123][2] = 11012 b[9][123][1] = 11013 b[9][123][0] = 11014 
c    b[9][124][2] = 11015 b[9][124][1] = 11016 b[9][124][0] = 11017 
c    b[9][125][2] = 11018 b[9][125][1] = 11019 b[9][125][0] = 11020 
c    b[9][126][2] = 11021 b[9][126][1] = 11022 b[9][126][0] = 11023 
c    b[9][127][2] = 11024 b[9][127][1] = 11025 b[9][127][0] = 11026 
c    b[9][128][2] = 11027 b[9][128][1] = 11028 b[9][128][0] = 11029 
c    b[9][129][2] = 11030 b[9][129][1] = 11031 b[9][129][0] = 11032 
c    b[9][130][2] = 11033 b[9][130][1] = 11034 b[9][130][0] = 11035 

c    b[10][1][2] = 11036 b[10][1][1] = 11037 b[10][1][0] = 11038 
c    b[10][2][2] = 11039 b[10][2][1] = 11040 b[10][2][0] = 11041 
c    b[10][3][2] = 11042 b[10][3][1] = 11043 b[10][3][0] = 11044 
c    b[10][4][2] = 11045 b[10][4][1] = 11046 b[10][4][0] = 11047 
c    b[10][5][2] = 11048 b[10][5][1] = 11049 b[10][5][0] = 11050 
c    b[10][6][2] = 11051 b[10][6][1] = 11052 b[10][6][0] = 11053 
c    b[10][7][2] = 11054 b[10][7][1] = 11055 b[10][7][0] = 11056 
c    b[10][8][2] = 11057 b[10][8][1] = 11058 b[10][8][0] = 11059 
c    b[10][9][2] = 11060 b[10][9][1] = 11061 b[10][9][0] = 11062 
c    b[10][10][2] = 11063 b[10][10][1] = 11064 b[10][10][0] = 11065 
c    b[10][11][2] = 11066 b[10][11][1] = 11067 b[10][11][0] = 11068 
c    b[10][12][2] = 11069 b[10][12][1] = 11070 b[10][12][0] = 11071 
c    b[10][13][2] = 11072 b[10][13][1] = 11073 b[10][13][0] = 11074 
c    b[10][14][2] = 11075 b[10][14][1] = 11076 b[10][14][0] = 11077 
c    b[10][15][2] = 11078 b[10][15][1] = 11079 b[10][15][0] = 11080 
c    b[10][16][2] = 11081 b[10][16][1] = 11082 b[10][16][0] = 11083 
c    b[10][17][2] = 11084 b[10][17][1] = 11085 b[10][17][0] = 11086 
c    b[10][18][2] = 11087 b[10][18][1] = 11088 b[10][18][0] = 11089 
c    b[10][19][2] = 11090 b[10][19][1] = 11091 b[10][19][0] = 11092 
c    b[10][20][2] = 11093 b[10][20][1] = 11094 b[10][20][0] = 11095 
c    b[10][21][2] = 11096 b[10][21][1] = 11097 b[10][21][0] = 11098 
c    b[10][22][2] = 11099 b[10][22][1] = 11100 b[10][22][0] = 11101 
c    b[10][23][2] = 11102 b[10][23][1] = 11103 b[10][23][0] = 11104 
c    b[10][24][2] = 11105 b[10][24][1] = 11106 b[10][24][0] = 11107 
c    b[10][25][2] = 11108 b[10][25][1] = 11109 b[10][25][0] = 11110 
c    b[10][26][2] = 11111 b[10][26][1] = 11112 b[10][26][0] = 11113 
c    b[10][27][2] = 11114 b[10][27][1] = 11115 b[10][27][0] = 11116 
c    b[10][28][2] = 11117 b[10][28][1] = 11118 b[10][28][0] = 11119 
c    b[10][29][2] = 11120 b[10][29][1] = 11121 b[10][29][0] = 11122 
c    b[10][30][2] = 11123 b[10][30][1] = 11124 b[10][30][0] = 11125 
c    b[10][31][2] = 11126 b[10][31][1] = 11127 b[10][31][0] = 11128 
c    b[10][32][2] = 11129 b[10][32][1] = 11130 b[10][32][0] = 11131 
c    b[10][33][2] = 11132 b[10][33][1] = 11133 b[10][33][0] = 11134 
c    b[10][34][2] = 11135 b[10][34][1] = 11136 b[10][34][0] = 11137 
c    b[10][35][2] = 11138 b[10][35][1] = 11139 b[10][35][0] = 11140 
c    b[10][36][2] = 11141 b[10][36][1] = 11142 b[10][36][0] = 11143 
c    b[10][37][2] = 11144 b[10][37][1] = 11145 b[10][37][0] = 11146 
c    b[10][38][2] = 11147 b[10][38][1] = 11148 b[10][38][0] = 11149 
c    b[10][39][2] = 11150 b[10][39][1] = 11151 b[10][39][0] = 11152 
c    b[10][40][2] = 11153 b[10][40][1] = 11154 b[10][40][0] = 11155 
c    b[10][41][2] = 11156 b[10][41][1] = 11157 b[10][41][0] = 11158 
c    b[10][42][2] = 11159 b[10][42][1] = 11160 b[10][42][0] = 11161 
c    b[10][43][2] = 11162 b[10][43][1] = 11163 b[10][43][0] = 11164 
c    b[10][44][2] = 11165 b[10][44][1] = 11166 b[10][44][0] = 11167 
c    b[10][45][2] = 11168 b[10][45][1] = 11169 b[10][45][0] = 11170 
c    b[10][46][2] = 11171 b[10][46][1] = 11172 b[10][46][0] = 11173 
c    b[10][47][2] = 11174 b[10][47][1] = 11175 b[10][47][0] = 11176 
c    b[10][48][2] = 11177 b[10][48][1] = 11178 b[10][48][0] = 11179 
c    b[10][49][2] = 11180 b[10][49][1] = 11181 b[10][49][0] = 11182 
c    b[10][50][2] = 11183 b[10][50][1] = 11184 b[10][50][0] = 11185 
c    b[10][51][2] = 11186 b[10][51][1] = 11187 b[10][51][0] = 11188 
c    b[10][52][2] = 11189 b[10][52][1] = 11190 b[10][52][0] = 11191 
c    b[10][53][2] = 11192 b[10][53][1] = 11193 b[10][53][0] = 11194 
c    b[10][54][2] = 11195 b[10][54][1] = 11196 b[10][54][0] = 11197 
c    b[10][55][2] = 11198 b[10][55][1] = 11199 b[10][55][0] = 11200 
c    b[10][56][2] = 11201 b[10][56][1] = 11202 b[10][56][0] = 11203 
c    b[10][57][2] = 11204 b[10][57][1] = 11205 b[10][57][0] = 11206 
c    b[10][58][2] = 11207 b[10][58][1] = 11208 b[10][58][0] = 11209 
c    b[10][59][2] = 11210 b[10][59][1] = 11211 b[10][59][0] = 11212 
c    b[10][60][2] = 11213 b[10][60][1] = 11214 b[10][60][0] = 11215 
c    b[10][61][2] = 11216 b[10][61][1] = 11217 b[10][61][0] = 11218 
c    b[10][62][2] = 11219 b[10][62][1] = 11220 b[10][62][0] = 11221 
c    b[10][63][2] = 11222 b[10][63][1] = 11223 b[10][63][0] = 11224 
c    b[10][64][2] = 11225 b[10][64][1] = 11226 b[10][64][0] = 11227 
c    b[10][65][2] = 11228 b[10][65][1] = 11229 b[10][65][0] = 11230 
c    b[10][66][2] = 11231 b[10][66][1] = 11232 b[10][66][0] = 11233 
c    b[10][67][2] = 11234 b[10][67][1] = 11235 b[10][67][0] = 11236 
c    b[10][68][2] = 11237 b[10][68][1] = 11238 b[10][68][0] = 11239 
c    b[10][69][2] = 11240 b[10][69][1] = 11241 b[10][69][0] = 11242 
c    b[10][70][2] = 11243 b[10][70][1] = 11244 b[10][70][0] = 11245 
c    b[10][71][2] = 11246 b[10][71][1] = 11247 b[10][71][0] = 11248 
c    b[10][72][2] = 11249 b[10][72][1] = 11250 b[10][72][0] = 11251 
c    b[10][73][2] = 11252 b[10][73][1] = 11253 b[10][73][0] = 11254 
c    b[10][74][2] = 11255 b[10][74][1] = 11256 b[10][74][0] = 11257 
c    b[10][75][2] = 11258 b[10][75][1] = 11259 b[10][75][0] = 11260 
c    b[10][76][2] = 11261 b[10][76][1] = 11262 b[10][76][0] = 11263 
c    b[10][77][2] = 11264 b[10][77][1] = 11265 b[10][77][0] = 11266 
c    b[10][78][2] = 11267 b[10][78][1] = 11268 b[10][78][0] = 11269 
c    b[10][79][2] = 11270 b[10][79][1] = 11271 b[10][79][0] = 11272 
c    b[10][80][2] = 11273 b[10][80][1] = 11274 b[10][80][0] = 11275 
c    b[10][81][2] = 11276 b[10][81][1] = 11277 b[10][81][0] = 11278 
c    b[10][82][2] = 11279 b[10][82][1] = 11280 b[10][82][0] = 11281 
c    b[10][83][2] = 11282 b[10][83][1] = 11283 b[10][83][0] = 11284 
c    b[10][84][2] = 11285 b[10][84][1] = 11286 b[10][84][0] = 11287 
c    b[10][85][2] = 11288 b[10][85][1] = 11289 b[10][85][0] = 11290 
c    b[10][86][2] = 11291 b[10][86][1] = 11292 b[10][86][0] = 11293 
c    b[10][87][2] = 11294 b[10][87][1] = 11295 b[10][87][0] = 11296 
c    b[10][88][2] = 11297 b[10][88][1] = 11298 b[10][88][0] = 11299 
c    b[10][89][2] = 11300 b[10][89][1] = 11301 b[10][89][0] = 11302 
c    b[10][90][2] = 11303 b[10][90][1] = 11304 b[10][90][0] = 11305 
c    b[10][91][2] = 11306 b[10][91][1] = 11307 b[10][91][0] = 11308 
c    b[10][92][2] = 11309 b[10][92][1] = 11310 b[10][92][0] = 11311 
c    b[10][93][2] = 11312 b[10][93][1] = 11313 b[10][93][0] = 11314 
c    b[10][94][2] = 11315 b[10][94][1] = 11316 b[10][94][0] = 11317 
c    b[10][95][2] = 11318 b[10][95][1] = 11319 b[10][95][0] = 11320 
c    b[10][96][2] = 11321 b[10][96][1] = 11322 b[10][96][0] = 11323 
c    b[10][97][2] = 11324 b[10][97][1] = 11325 b[10][97][0] = 11326 
c    b[10][98][2] = 11327 b[10][98][1] = 11328 b[10][98][0] = 11329 
c    b[10][99][2] = 11330 b[10][99][1] = 11331 b[10][99][0] = 11332 
c    b[10][100][2] = 11333 b[10][100][1] = 11334 b[10][100][0] = 11335 
c    b[10][101][2] = 11336 b[10][101][1] = 11337 b[10][101][0] = 11338 
c    b[10][102][2] = 11339 b[10][102][1] = 11340 b[10][102][0] = 11341 
c    b[10][103][2] = 11342 b[10][103][1] = 11343 b[10][103][0] = 11344 
c    b[10][104][2] = 11345 b[10][104][1] = 11346 b[10][104][0] = 11347 
c    b[10][105][2] = 11348 b[10][105][1] = 11349 b[10][105][0] = 11350 
c    b[10][106][2] = 11351 b[10][106][1] = 11352 b[10][106][0] = 11353 
c    b[10][107][2] = 11354 b[10][107][1] = 11355 b[10][107][0] = 11356 
c    b[10][108][2] = 11357 b[10][108][1] = 11358 b[10][108][0] = 11359 
c    b[10][109][2] = 11360 b[10][109][1] = 11361 b[10][109][0] = 11362 
c    b[10][110][2] = 11363 b[10][110][1] = 11364 b[10][110][0] = 11365 
c    b[10][111][2] = 11366 b[10][111][1] = 11367 b[10][111][0] = 11368 
c    b[10][112][2] = 11369 b[10][112][1] = 11370 b[10][112][0] = 11371 
c    b[10][113][2] = 11372 b[10][113][1] = 11373 b[10][113][0] = 11374 
c    b[10][114][2] = 11375 b[10][114][1] = 11376 b[10][114][0] = 11377 
c    b[10][115][2] = 11378 b[10][115][1] = 11379 b[10][115][0] = 11380 
c    b[10][116][2] = 11381 b[10][116][1] = 11382 b[10][116][0] = 11383 
c    b[10][117][2] = 11384 b[10][117][1] = 11385 b[10][117][0] = 11386 

c    b[11][1][2] = 11387 b[11][1][1] = 11388 b[11][1][0] = 11389 
c    b[11][2][2] = 11390 b[11][2][1] = 11391 b[11][2][0] = 11392 
c    b[11][3][2] = 11393 b[11][3][1] = 11394 b[11][3][0] = 11395 
c    b[11][4][2] = 11396 b[11][4][1] = 11397 b[11][4][0] = 11398 
c    b[11][5][2] = 11399 b[11][5][1] = 11400 b[11][5][0] = 11401 
c    b[11][6][2] = 11402 b[11][6][1] = 11403 b[11][6][0] = 11404 
c    b[11][7][2] = 11405 b[11][7][1] = 11406 b[11][7][0] = 11407 
c    b[11][8][2] = 11408 b[11][8][1] = 11409 b[11][8][0] = 11410 
c    b[11][9][2] = 11411 b[11][9][1] = 11412 b[11][9][0] = 11413 
c    b[11][10][2] = 11414 b[11][10][1] = 11415 b[11][10][0] = 11416 
c    b[11][11][2] = 11417 b[11][11][1] = 11418 b[11][11][0] = 11419 
c    b[11][12][2] = 11420 b[11][12][1] = 11421 b[11][12][0] = 11422 
c    b[11][13][2] = 11423 b[11][13][1] = 11424 b[11][13][0] = 11425 
c    b[11][14][2] = 11426 b[11][14][1] = 11427 b[11][14][0] = 11428 
c    b[11][15][2] = 11429 b[11][15][1] = 11430 b[11][15][0] = 11431 
c    b[11][16][2] = 11432 b[11][16][1] = 11433 b[11][16][0] = 11434 
c    b[11][17][2] = 11435 b[11][17][1] = 11436 b[11][17][0] = 11437 
c    b[11][18][2] = 11438 b[11][18][1] = 11439 b[11][18][0] = 11440 
c    b[11][19][2] = 11441 b[11][19][1] = 11442 b[11][19][0] = 11443 
c    b[11][20][2] = 11444 b[11][20][1] = 11445 b[11][20][0] = 11446 
c    b[11][21][2] = 11447 b[11][21][1] = 11448 b[11][21][0] = 11449 
c    b[11][22][2] = 11450 b[11][22][1] = 11451 b[11][22][0] = 11452 
c    b[11][23][2] = 11453 b[11][23][1] = 11454 b[11][23][0] = 11455 
c    b[11][24][2] = 11456 b[11][24][1] = 11457 b[11][24][0] = 11458 
c    b[11][25][2] = 11459 b[11][25][1] = 11460 b[11][25][0] = 11461 
c    b[11][26][2] = 11462 b[11][26][1] = 11463 b[11][26][0] = 11464 
c    b[11][27][2] = 11465 b[11][27][1] = 11466 b[11][27][0] = 11467 
c    b[11][28][2] = 11468 b[11][28][1] = 11469 b[11][28][0] = 11470 
c    b[11][29][2] = 11471 b[11][29][1] = 11472 b[11][29][0] = 11473 
c    b[11][30][2] = 11474 b[11][30][1] = 11475 b[11][30][0] = 11476 
c    b[11][31][2] = 11477 b[11][31][1] = 11478 b[11][31][0] = 11479 
c    b[11][32][2] = 11480 b[11][32][1] = 11481 b[11][32][0] = 11482 
c    b[11][33][2] = 11483 b[11][33][1] = 11484 b[11][33][0] = 11485 
c    b[11][34][2] = 11486 b[11][34][1] = 11487 b[11][34][0] = 11488 
c    b[11][35][2] = 11489 b[11][35][1] = 11490 b[11][35][0] = 11491 
c    b[11][36][2] = 11492 b[11][36][1] = 11493 b[11][36][0] = 11494 
c    b[11][37][2] = 11495 b[11][37][1] = 11496 b[11][37][0] = 11497 
c    b[11][38][2] = 11498 b[11][38][1] = 11499 b[11][38][0] = 11500 
c    b[11][39][2] = 11501 b[11][39][1] = 11502 b[11][39][0] = 11503 
c    b[11][40][2] = 11504 b[11][40][1] = 11505 b[11][40][0] = 11506 
c    b[11][41][2] = 11507 b[11][41][1] = 11508 b[11][41][0] = 11509 
c    b[11][42][2] = 11510 b[11][42][1] = 11511 b[11][42][0] = 11512 
c    b[11][43][2] = 11513 b[11][43][1] = 11514 b[11][43][0] = 11515 
c    b[11][44][2] = 11516 b[11][44][1] = 11517 b[11][44][0] = 11518 
c    b[11][45][2] = 11519 b[11][45][1] = 11520 b[11][45][0] = 11521 
c    b[11][46][2] = 11522 b[11][46][1] = 11523 b[11][46][0] = 11524 
c    b[11][47][2] = 11525 b[11][47][1] = 11526 b[11][47][0] = 11527 
c    b[11][48][2] = 11528 b[11][48][1] = 11529 b[11][48][0] = 11530 
c    b[11][49][2] = 11531 b[11][49][1] = 11532 b[11][49][0] = 11533 
c    b[11][50][2] = 11534 b[11][50][1] = 11535 b[11][50][0] = 11536 
c    b[11][51][2] = 11537 b[11][51][1] = 11538 b[11][51][0] = 11539 
c    b[11][52][2] = 11540 b[11][52][1] = 11541 b[11][52][0] = 11542 
c    b[11][53][2] = 11543 b[11][53][1] = 11544 b[11][53][0] = 11545 
c    b[11][54][2] = 11546 b[11][54][1] = 11547 b[11][54][0] = 11548 
c    b[11][55][2] = 11549 b[11][55][1] = 11550 b[11][55][0] = 11551 
c    b[11][56][2] = 11552 b[11][56][1] = 11553 b[11][56][0] = 11554 
c    b[11][57][2] = 11555 b[11][57][1] = 11556 b[11][57][0] = 11557 
c    b[11][58][2] = 11558 b[11][58][1] = 11559 b[11][58][0] = 11560 
c    b[11][59][2] = 11561 b[11][59][1] = 11562 b[11][59][0] = 11563 
c    b[11][60][2] = 11564 b[11][60][1] = 11565 b[11][60][0] = 11566 
c    b[11][61][2] = 11567 b[11][61][1] = 11568 b[11][61][0] = 11569 
c    b[11][62][2] = 11570 b[11][62][1] = 11571 b[11][62][0] = 11572 
c    b[11][63][2] = 11573 b[11][63][1] = 11574 b[11][63][0] = 11575 
c    b[11][64][2] = 11576 b[11][64][1] = 11577 b[11][64][0] = 11578 
c    b[11][65][2] = 11579 b[11][65][1] = 11580 b[11][65][0] = 11581 
c    b[11][66][2] = 11582 b[11][66][1] = 11583 b[11][66][0] = 11584 
c    b[11][67][2] = 11585 b[11][67][1] = 11586 b[11][67][0] = 11587 
c    b[11][68][2] = 11588 b[11][68][1] = 11589 b[11][68][0] = 11590 
c    b[11][69][2] = 11591 b[11][69][1] = 11592 b[11][69][0] = 11593 
c    b[11][70][2] = 11594 b[11][70][1] = 11595 b[11][70][0] = 11596 
c    b[11][71][2] = 11597 b[11][71][1] = 11598 b[11][71][0] = 11599 
c    b[11][72][2] = 11600 b[11][72][1] = 11601 b[11][72][0] = 11602 
c    b[11][73][2] = 11603 b[11][73][1] = 11604 b[11][73][0] = 11605 
c    b[11][74][2] = 11606 b[11][74][1] = 11607 b[11][74][0] = 11608 
c    b[11][75][2] = 11609 b[11][75][1] = 11610 b[11][75][0] = 11611 
c    b[11][76][2] = 11612 b[11][76][1] = 11613 b[11][76][0] = 11614 
c    b[11][77][2] = 11615 b[11][77][1] = 11616 b[11][77][0] = 11617 
c    b[11][78][2] = 11618 b[11][78][1] = 11619 b[11][78][0] = 11620 
c    b[11][79][2] = 11621 b[11][79][1] = 11622 b[11][79][0] = 11623 
c    b[11][80][2] = 11624 b[11][80][1] = 11625 b[11][80][0] = 11626 
c    b[11][81][2] = 11627 b[11][81][1] = 11628 b[11][81][0] = 11629 
c    b[11][82][2] = 11630 b[11][82][1] = 11631 b[11][82][0] = 11632 
c    b[11][83][2] = 11633 b[11][83][1] = 11634 b[11][83][0] = 11635 
c    b[11][84][2] = 11636 b[11][84][1] = 11637 b[11][84][0] = 11638 
c    b[11][85][2] = 11639 b[11][85][1] = 11640 b[11][85][0] = 11641 
c    b[11][86][2] = 11642 b[11][86][1] = 11643 b[11][86][0] = 11644 
c    b[11][87][2] = 11645 b[11][87][1] = 11646 b[11][87][0] = 11647 
c    b[11][88][2] = 11648 b[11][88][1] = 11649 b[11][88][0] = 11650 
c    b[11][89][2] = 11651 b[11][89][1] = 11652 b[11][89][0] = 11653 
c    b[11][90][2] = 11654 b[11][90][1] = 11655 b[11][90][0] = 11656 
c    b[11][91][2] = 11657 b[11][91][1] = 11658 b[11][91][0] = 11659 
c    b[11][92][2] = 11660 b[11][92][1] = 11661 b[11][92][0] = 11662 
c    b[11][93][2] = 11663 b[11][93][1] = 11664 b[11][93][0] = 11665 
c    b[11][94][2] = 11666 b[11][94][1] = 11667 b[11][94][0] = 11668 
c    b[11][95][2] = 11669 b[11][95][1] = 11670 b[11][95][0] = 11671 
c    b[11][96][2] = 11672 b[11][96][1] = 11673 b[11][96][0] = 11674 
c    b[11][97][2] = 11675 b[11][97][1] = 11676 b[11][97][0] = 11677 
c    b[11][98][2] = 11678 b[11][98][1] = 11679 b[11][98][0] = 11680 
c    b[11][99][2] = 11681 b[11][99][1] = 11682 b[11][99][0] = 11683 
c    b[11][100][2] = 11684 b[11][100][1] = 11685 b[11][100][0] = 11686 
c    b[11][101][2] = 11687 b[11][101][1] = 11688 b[11][101][0] = 11689 
c    b[11][102][2] = 11690 b[11][102][1] = 11691 b[11][102][0] = 11692 
c    b[11][103][2] = 11693 b[11][103][1] = 11694 b[11][103][0] = 11695 
c    b[11][104][2] = 11696 b[11][104][1] = 11697 b[11][104][0] = 11698 
c    b[11][105][2] = 11699 b[11][105][1] = 11700 b[11][105][0] = 11701 
c    b[11][106][2] = 11702 b[11][106][1] = 11703 b[11][106][0] = 11704 

c    b[12][1][2] = 11705 b[12][1][1] = 11706 b[12][1][0] = 11707 
c    b[12][2][2] = 11708 b[12][2][1] = 11709 b[12][2][0] = 11710 
c    b[12][3][2] = 11711 b[12][3][1] = 11712 b[12][3][0] = 11713 
c    b[12][4][2] = 11714 b[12][4][1] = 11715 b[12][4][0] = 11716 
c    b[12][5][2] = 11717 b[12][5][1] = 11718 b[12][5][0] = 11719 
c    b[12][6][2] = 11720 b[12][6][1] = 11721 b[12][6][0] = 11722 
c    b[12][7][2] = 11723 b[12][7][1] = 11724 b[12][7][0] = 11725 
c    b[12][8][2] = 11726 b[12][8][1] = 11727 b[12][8][0] = 11728 
c    b[12][9][2] = 11729 b[12][9][1] = 11730 b[12][9][0] = 11731 
c    b[12][10][2] = 11732 b[12][10][1] = 11733 b[12][10][0] = 11734 
c    b[12][11][2] = 11735 b[12][11][1] = 11736 b[12][11][0] = 11737 
c    b[12][12][2] = 11738 b[12][12][1] = 11739 b[12][12][0] = 11740 
c    b[12][13][2] = 11741 b[12][13][1] = 11742 b[12][13][0] = 11743 
c    b[12][14][2] = 11744 b[12][14][1] = 11745 b[12][14][0] = 11746 
c    b[12][15][2] = 11747 b[12][15][1] = 11748 b[12][15][0] = 11749 
c    b[12][16][2] = 11750 b[12][16][1] = 11751 b[12][16][0] = 11752 
c    b[12][17][2] = 11753 b[12][17][1] = 11754 b[12][17][0] = 11755 
c    b[12][18][2] = 11756 b[12][18][1] = 11757 b[12][18][0] = 11758 
c    b[12][19][2] = 11759 b[12][19][1] = 11760 b[12][19][0] = 11761 
c    b[12][20][2] = 11762 b[12][20][1] = 11763 b[12][20][0] = 11764 
c    b[12][21][2] = 11765 b[12][21][1] = 11766 b[12][21][0] = 11767 
c    b[12][22][2] = 11768 b[12][22][1] = 11769 b[12][22][0] = 11770 
c    b[12][23][2] = 11771 b[12][23][1] = 11772 b[12][23][0] = 11773 
c    b[12][24][2] = 11774 b[12][24][1] = 11775 b[12][24][0] = 11776 
c    b[12][25][2] = 11777 b[12][25][1] = 11778 b[12][25][0] = 11779 
c    b[12][26][2] = 11780 b[12][26][1] = 11781 b[12][26][0] = 11782 
c    b[12][27][2] = 11783 b[12][27][1] = 11784 b[12][27][0] = 11785 
c    b[12][28][2] = 11786 b[12][28][1] = 11787 b[12][28][0] = 11788 
c    b[12][29][2] = 11789 b[12][29][1] = 11790 b[12][29][0] = 11791 
c    b[12][30][2] = 11792 b[12][30][1] = 11793 b[12][30][0] = 11794 
c    b[12][31][2] = 11795 b[12][31][1] = 11796 b[12][31][0] = 11797 
c    b[12][32][2] = 11798 b[12][32][1] = 11799 b[12][32][0] = 11800 
c    b[12][33][2] = 11801 b[12][33][1] = 11802 b[12][33][0] = 11803 
c    b[12][34][2] = 11804 b[12][34][1] = 11805 b[12][34][0] = 11806 
c    b[12][35][2] = 11807 b[12][35][1] = 11808 b[12][35][0] = 11809 
c    b[12][36][2] = 11810 b[12][36][1] = 11811 b[12][36][0] = 11812 
c    b[12][37][2] = 11813 b[12][37][1] = 11814 b[12][37][0] = 11815 
c    b[12][38][2] = 11816 b[12][38][1] = 11817 b[12][38][0] = 11818 
c    b[12][39][2] = 11819 b[12][39][1] = 11820 b[12][39][0] = 11821 
c    b[12][40][2] = 11822 b[12][40][1] = 11823 b[12][40][0] = 11824 
c    b[12][41][2] = 11825 b[12][41][1] = 11826 b[12][41][0] = 11827 
c    b[12][42][2] = 11828 b[12][42][1] = 11829 b[12][42][0] = 11830 
c    b[12][43][2] = 11831 b[12][43][1] = 11832 b[12][43][0] = 11833 
c    b[12][44][2] = 11834 b[12][44][1] = 11835 b[12][44][0] = 11836 
c    b[12][45][2] = 11837 b[12][45][1] = 11838 b[12][45][0] = 11839 
c    b[12][46][2] = 11840 b[12][46][1] = 11841 b[12][46][0] = 11842 
c    b[12][47][2] = 11843 b[12][47][1] = 11844 b[12][47][0] = 11845 
c    b[12][48][2] = 11846 b[12][48][1] = 11847 b[12][48][0] = 11848 
c    b[12][49][2] = 11849 b[12][49][1] = 11850 b[12][49][0] = 11851 
c    b[12][50][2] = 11852 b[12][50][1] = 11853 b[12][50][0] = 11854 
c    b[12][51][2] = 11855 b[12][51][1] = 11856 b[12][51][0] = 11857 
c    b[12][52][2] = 11858 b[12][52][1] = 11859 b[12][52][0] = 11860 
c    b[12][53][2] = 11861 b[12][53][1] = 11862 b[12][53][0] = 11863 
c    b[12][54][2] = 11864 b[12][54][1] = 11865 b[12][54][0] = 11866 
c    b[12][55][2] = 11867 b[12][55][1] = 11868 b[12][55][0] = 11869 
c    b[12][56][2] = 11870 b[12][56][1] = 11871 b[12][56][0] = 11872 
c    b[12][57][2] = 11873 b[12][57][1] = 11874 b[12][57][0] = 11875 
c    b[12][58][2] = 11876 b[12][58][1] = 11877 b[12][58][0] = 11878 
c    b[12][59][2] = 11879 b[12][59][1] = 11880 b[12][59][0] = 11881 
c    b[12][60][2] = 11882 b[12][60][1] = 11883 b[12][60][0] = 11884 
c    b[12][61][2] = 11885 b[12][61][1] = 11886 b[12][61][0] = 11887 
c    b[12][62][2] = 11888 b[12][62][1] = 11889 b[12][62][0] = 11890 
c    b[12][63][2] = 11891 b[12][63][1] = 11892 b[12][63][0] = 11893 
c    b[12][64][2] = 11894 b[12][64][1] = 11895 b[12][64][0] = 11896 
c    b[12][65][2] = 11897 b[12][65][1] = 11898 b[12][65][0] = 11899 
c    b[12][66][2] = 11900 b[12][66][1] = 11901 b[12][66][0] = 11902 
c    b[12][67][2] = 11903 b[12][67][1] = 11904 b[12][67][0] = 11905 
c    b[12][68][2] = 11906 b[12][68][1] = 11907 b[12][68][0] = 11908 
c    b[12][69][2] = 11909 b[12][69][1] = 11910 b[12][69][0] = 11911 
c    b[12][70][2] = 11912 b[12][70][1] = 11913 b[12][70][0] = 11914 
c    b[12][71][2] = 11915 b[12][71][1] = 11916 b[12][71][0] = 11917 
c    b[12][72][2] = 11918 b[12][72][1] = 11919 b[12][72][0] = 11920 
c    b[12][73][2] = 11921 b[12][73][1] = 11922 b[12][73][0] = 11923 
c    b[12][74][2] = 11924 b[12][74][1] = 11925 b[12][74][0] = 11926 
c    b[12][75][2] = 11927 b[12][75][1] = 11928 b[12][75][0] = 11929 
c    b[12][76][2] = 11930 b[12][76][1] = 11931 b[12][76][0] = 11932 
c    b[12][77][2] = 11933 b[12][77][1] = 11934 b[12][77][0] = 11935 
c    b[12][78][2] = 11936 b[12][78][1] = 11937 b[12][78][0] = 11938 
c    b[12][79][2] = 11939 b[12][79][1] = 11940 b[12][79][0] = 11941 
c    b[12][80][2] = 11942 b[12][80][1] = 11943 b[12][80][0] = 11944 
c    b[12][81][2] = 11945 b[12][81][1] = 11946 b[12][81][0] = 11947 
c    b[12][82][2] = 11948 b[12][82][1] = 11949 b[12][82][0] = 11950 
c    b[12][83][2] = 11951 b[12][83][1] = 11952 b[12][83][0] = 11953 
c    b[12][84][2] = 11954 b[12][84][1] = 11955 b[12][84][0] = 11956 
c    b[12][85][2] = 11957 b[12][85][1] = 11958 b[12][85][0] = 11959 
c    b[12][86][2] = 11960 b[12][86][1] = 11961 b[12][86][0] = 11962 
c    b[12][87][2] = 11963 b[12][87][1] = 11964 b[12][87][0] = 11965 
c    b[12][88][2] = 11966 b[12][88][1] = 11967 b[12][88][0] = 11968 
c    b[12][89][2] = 11969 b[12][89][1] = 11970 b[12][89][0] = 11971 
c    b[12][90][2] = 11972 b[12][90][1] = 11973 b[12][90][0] = 11974 
c    b[12][91][2] = 11975 b[12][91][1] = 11976 b[12][91][0] = 11977 
c    b[12][92][2] = 11978 b[12][92][1] = 11979 b[12][92][0] = 11980 
c    b[12][93][2] = 11981 b[12][93][1] = 11982 b[12][93][0] = 11983 
c    b[12][94][2] = 11984 b[12][94][1] = 11985 b[12][94][0] = 11986 
c    b[12][95][2] = 11987 b[12][95][1] = 11988 b[12][95][0] = 11989 
c    b[12][96][2] = 11990 b[12][96][1] = 11991 b[12][96][0] = 11992 
c    b[12][97][2] = 11993 b[12][97][1] = 11994 b[12][97][0] = 11995 

c    b[13][1][2] = 11996 b[13][1][1] = 11997 b[13][1][0] = 11998 
c    b[13][2][2] = 11999 b[13][2][1] = 12000 b[13][2][0] = 12001 
c    b[13][3][2] = 12002 b[13][3][1] = 12003 b[13][3][0] = 12004 
c    b[13][4][2] = 12005 b[13][4][1] = 12006 b[13][4][0] = 12007 
c    b[13][5][2] = 12008 b[13][5][1] = 12009 b[13][5][0] = 12010 
c    b[13][6][2] = 12011 b[13][6][1] = 12012 b[13][6][0] = 12013 
c    b[13][7][2] = 12014 b[13][7][1] = 12015 b[13][7][0] = 12016 
c    b[13][8][2] = 12017 b[13][8][1] = 12018 b[13][8][0] = 12019 
c    b[13][9][2] = 12020 b[13][9][1] = 12021 b[13][9][0] = 12022 
c    b[13][10][2] = 12023 b[13][10][1] = 12024 b[13][10][0] = 12025 
c    b[13][11][2] = 12026 b[13][11][1] = 12027 b[13][11][0] = 12028 
c    b[13][12][2] = 12029 b[13][12][1] = 12030 b[13][12][0] = 12031 
c    b[13][13][2] = 12032 b[13][13][1] = 12033 b[13][13][0] = 12034 
c    b[13][14][2] = 12035 b[13][14][1] = 12036 b[13][14][0] = 12037 
c    b[13][15][2] = 12038 b[13][15][1] = 12039 b[13][15][0] = 12040 
c    b[13][16][2] = 12041 b[13][16][1] = 12042 b[13][16][0] = 12043 
c    b[13][17][2] = 12044 b[13][17][1] = 12045 b[13][17][0] = 12046 
c    b[13][18][2] = 12047 b[13][18][1] = 12048 b[13][18][0] = 12049 
c    b[13][19][2] = 12050 b[13][19][1] = 12051 b[13][19][0] = 12052 
c    b[13][20][2] = 12053 b[13][20][1] = 12054 b[13][20][0] = 12055 
c    b[13][21][2] = 12056 b[13][21][1] = 12057 b[13][21][0] = 12058 
c    b[13][22][2] = 12059 b[13][22][1] = 12060 b[13][22][0] = 12061 
c    b[13][23][2] = 12062 b[13][23][1] = 12063 b[13][23][0] = 12064 
c    b[13][24][2] = 12065 b[13][24][1] = 12066 b[13][24][0] = 12067 
c    b[13][25][2] = 12068 b[13][25][1] = 12069 b[13][25][0] = 12070 
c    b[13][26][2] = 12071 b[13][26][1] = 12072 b[13][26][0] = 12073 
c    b[13][27][2] = 12074 b[13][27][1] = 12075 b[13][27][0] = 12076 
c    b[13][28][2] = 12077 b[13][28][1] = 12078 b[13][28][0] = 12079 
c    b[13][29][2] = 12080 b[13][29][1] = 12081 b[13][29][0] = 12082 
c    b[13][30][2] = 12083 b[13][30][1] = 12084 b[13][30][0] = 12085 
c    b[13][31][2] = 12086 b[13][31][1] = 12087 b[13][31][0] = 12088 
c    b[13][32][2] = 12089 b[13][32][1] = 12090 b[13][32][0] = 12091 
c    b[13][33][2] = 12092 b[13][33][1] = 12093 b[13][33][0] = 12094 
c    b[13][34][2] = 12095 b[13][34][1] = 12096 b[13][34][0] = 12097 
c    b[13][35][2] = 12098 b[13][35][1] = 12099 b[13][35][0] = 12100 
c    b[13][36][2] = 12101 b[13][36][1] = 12102 b[13][36][0] = 12103 
c    b[13][37][2] = 12104 b[13][37][1] = 12105 b[13][37][0] = 12106 
c    b[13][38][2] = 12107 b[13][38][1] = 12108 b[13][38][0] = 12109 
c    b[13][39][2] = 12110 b[13][39][1] = 12111 b[13][39][0] = 12112 
c    b[13][40][2] = 12113 b[13][40][1] = 12114 b[13][40][0] = 12115 
c    b[13][41][2] = 12116 b[13][41][1] = 12117 b[13][41][0] = 12118 
c    b[13][42][2] = 12119 b[13][42][1] = 12120 b[13][42][0] = 12121 
c    b[13][43][2] = 12122 b[13][43][1] = 12123 b[13][43][0] = 12124 
c    b[13][44][2] = 12125 b[13][44][1] = 12126 b[13][44][0] = 12127 
c    b[13][45][2] = 12128 b[13][45][1] = 12129 b[13][45][0] = 12130 
c    b[13][46][2] = 12131 b[13][46][1] = 12132 b[13][46][0] = 12133 
c    b[13][47][2] = 12134 b[13][47][1] = 12135 b[13][47][0] = 12136 
c    b[13][48][2] = 12137 b[13][48][1] = 12138 b[13][48][0] = 12139 
c    b[13][49][2] = 12140 b[13][49][1] = 12141 b[13][49][0] = 12142 
c    b[13][50][2] = 12143 b[13][50][1] = 12144 b[13][50][0] = 12145 
c    b[13][51][2] = 12146 b[13][51][1] = 12147 b[13][51][0] = 12148 
c    b[13][52][2] = 12149 b[13][52][1] = 12150 b[13][52][0] = 12151 
c    b[13][53][2] = 12152 b[13][53][1] = 12153 b[13][53][0] = 12154 
c    b[13][54][2] = 12155 b[13][54][1] = 12156 b[13][54][0] = 12157 
c    b[13][55][2] = 12158 b[13][55][1] = 12159 b[13][55][0] = 12160 
c    b[13][56][2] = 12161 b[13][56][1] = 12162 b[13][56][0] = 12163 
c    b[13][57][2] = 12164 b[13][57][1] = 12165 b[13][57][0] = 12166 
c    b[13][58][2] = 12167 b[13][58][1] = 12168 b[13][58][0] = 12169 
c    b[13][59][2] = 12170 b[13][59][1] = 12171 b[13][59][0] = 12172 
c    b[13][60][2] = 12173 b[13][60][1] = 12174 b[13][60][0] = 12175 
c    b[13][61][2] = 12176 b[13][61][1] = 12177 b[13][61][0] = 12178 
c    b[13][62][2] = 12179 b[13][62][1] = 12180 b[13][62][0] = 12181 
c    b[13][63][2] = 12182 b[13][63][1] = 12183 b[13][63][0] = 12184 
c    b[13][64][2] = 12185 b[13][64][1] = 12186 b[13][64][0] = 12187 
c    b[13][65][2] = 12188 b[13][65][1] = 12189 b[13][65][0] = 12190 
c    b[13][66][2] = 12191 b[13][66][1] = 12192 b[13][66][0] = 12193 
c    b[13][67][2] = 12194 b[13][67][1] = 12195 b[13][67][0] = 12196 
c    b[13][68][2] = 12197 b[13][68][1] = 12198 b[13][68][0] = 12199 
c    b[13][69][2] = 12200 b[13][69][1] = 12201 b[13][69][0] = 12202 
c    b[13][70][2] = 12203 b[13][70][1] = 12204 b[13][70][0] = 12205 
c    b[13][71][2] = 12206 b[13][71][1] = 12207 b[13][71][0] = 12208 
c    b[13][72][2] = 12209 b[13][72][1] = 12210 b[13][72][0] = 12211 
c    b[13][73][2] = 12212 b[13][73][1] = 12213 b[13][73][0] = 12214 
c    b[13][74][2] = 12215 b[13][74][1] = 12216 b[13][74][0] = 12217 
c    b[13][75][2] = 12218 b[13][75][1] = 12219 b[13][75][0] = 12220 
c    b[13][76][2] = 12221 b[13][76][1] = 12222 b[13][76][0] = 12223 
c    b[13][77][2] = 12224 b[13][77][1] = 12225 b[13][77][0] = 12226 
c    b[13][78][2] = 12227 b[13][78][1] = 12228 b[13][78][0] = 12229 
c    b[13][79][2] = 12230 b[13][79][1] = 12231 b[13][79][0] = 12232 
c    b[13][80][2] = 12233 b[13][80][1] = 12234 b[13][80][0] = 12235 
c    b[13][81][2] = 12236 b[13][81][1] = 12237 b[13][81][0] = 12238 
c    b[13][82][2] = 12239 b[13][82][1] = 12240 b[13][82][0] = 12241 
c    b[13][83][2] = 12242 b[13][83][1] = 12243 b[13][83][0] = 12244 
c    b[13][84][2] = 12245 b[13][84][1] = 12246 b[13][84][0] = 12247 
c    b[13][85][2] = 12248 b[13][85][1] = 12249 b[13][85][0] = 12250 
c    b[13][86][2] = 12251 b[13][86][1] = 12252 b[13][86][0] = 12253 
c    b[13][87][2] = 12254 b[13][87][1] = 12255 b[13][87][0] = 12256 
c    b[13][88][2] = 12257 b[13][88][1] = 12258 b[13][88][0] = 12259 
c    b[13][89][2] = 12260 b[13][89][1] = 12261 b[13][89][0] = 12262 
c    b[13][90][2] = 12263 b[13][90][1] = 12264 b[13][90][0] = 12265 

c    b[14][1][2] = 12266 b[14][1][1] = 12267 b[14][1][0] = 12268 
c    b[14][2][2] = 12269 b[14][2][1] = 12270 b[14][2][0] = 12271 
c    b[14][3][2] = 12272 b[14][3][1] = 12273 b[14][3][0] = 12274 
c    b[14][4][2] = 12275 b[14][4][1] = 12276 b[14][4][0] = 12277 
c    b[14][5][2] = 12278 b[14][5][1] = 12279 b[14][5][0] = 12280 
c    b[14][6][2] = 12281 b[14][6][1] = 12282 b[14][6][0] = 12283 
c    b[14][7][2] = 12284 b[14][7][1] = 12285 b[14][7][0] = 12286 
c    b[14][8][2] = 12287 b[14][8][1] = 12288 b[14][8][0] = 12289 
c    b[14][9][2] = 12290 b[14][9][1] = 12291 b[14][9][0] = 12292 
c    b[14][10][2] = 12293 b[14][10][1] = 12294 b[14][10][0] = 12295 
c    b[14][11][2] = 12296 b[14][11][1] = 12297 b[14][11][0] = 12298 
c    b[14][12][2] = 12299 b[14][12][1] = 12300 b[14][12][0] = 12301 
c    b[14][13][2] = 12302 b[14][13][1] = 12303 b[14][13][0] = 12304 
c    b[14][14][2] = 12305 b[14][14][1] = 12306 b[14][14][0] = 12307 
c    b[14][15][2] = 12308 b[14][15][1] = 12309 b[14][15][0] = 12310 
c    b[14][16][2] = 12311 b[14][16][1] = 12312 b[14][16][0] = 12313 
c    b[14][17][2] = 12314 b[14][17][1] = 12315 b[14][17][0] = 12316 
c    b[14][18][2] = 12317 b[14][18][1] = 12318 b[14][18][0] = 12319 
c    b[14][19][2] = 12320 b[14][19][1] = 12321 b[14][19][0] = 12322 
c    b[14][20][2] = 12323 b[14][20][1] = 12324 b[14][20][0] = 12325 
c    b[14][21][2] = 12326 b[14][21][1] = 12327 b[14][21][0] = 12328 
c    b[14][22][2] = 12329 b[14][22][1] = 12330 b[14][22][0] = 12331 
c    b[14][23][2] = 12332 b[14][23][1] = 12333 b[14][23][0] = 12334 
c    b[14][24][2] = 12335 b[14][24][1] = 12336 b[14][24][0] = 12337 
c    b[14][25][2] = 12338 b[14][25][1] = 12339 b[14][25][0] = 12340 
c    b[14][26][2] = 12341 b[14][26][1] = 12342 b[14][26][0] = 12343 
c    b[14][27][2] = 12344 b[14][27][1] = 12345 b[14][27][0] = 12346 
c    b[14][28][2] = 12347 b[14][28][1] = 12348 b[14][28][0] = 12349 
c    b[14][29][2] = 12350 b[14][29][1] = 12351 b[14][29][0] = 12352 
c    b[14][30][2] = 12353 b[14][30][1] = 12354 b[14][30][0] = 12355 
c    b[14][31][2] = 12356 b[14][31][1] = 12357 b[14][31][0] = 12358 
c    b[14][32][2] = 12359 b[14][32][1] = 12360 b[14][32][0] = 12361 
c    b[14][33][2] = 12362 b[14][33][1] = 12363 b[14][33][0] = 12364 
c    b[14][34][2] = 12365 b[14][34][1] = 12366 b[14][34][0] = 12367 
c    b[14][35][2] = 12368 b[14][35][1] = 12369 b[14][35][0] = 12370 
c    b[14][36][2] = 12371 b[14][36][1] = 12372 b[14][36][0] = 12373 
c    b[14][37][2] = 12374 b[14][37][1] = 12375 b[14][37][0] = 12376 
c    b[14][38][2] = 12377 b[14][38][1] = 12378 b[14][38][0] = 12379 
c    b[14][39][2] = 12380 b[14][39][1] = 12381 b[14][39][0] = 12382 
c    b[14][40][2] = 12383 b[14][40][1] = 12384 b[14][40][0] = 12385 
c    b[14][41][2] = 12386 b[14][41][1] = 12387 b[14][41][0] = 12388 
c    b[14][42][2] = 12389 b[14][42][1] = 12390 b[14][42][0] = 12391 
c    b[14][43][2] = 12392 b[14][43][1] = 12393 b[14][43][0] = 12394 
c    b[14][44][2] = 12395 b[14][44][1] = 12396 b[14][44][0] = 12397 
c    b[14][45][2] = 12398 b[14][45][1] = 12399 b[14][45][0] = 12400 
c    b[14][46][2] = 12401 b[14][46][1] = 12402 b[14][46][0] = 12403 
c    b[14][47][2] = 12404 b[14][47][1] = 12405 b[14][47][0] = 12406 
c    b[14][48][2] = 12407 b[14][48][1] = 12408 b[14][48][0] = 12409 
c    b[14][49][2] = 12410 b[14][49][1] = 12411 b[14][49][0] = 12412 
c    b[14][50][2] = 12413 b[14][50][1] = 12414 b[14][50][0] = 12415 
c    b[14][51][2] = 12416 b[14][51][1] = 12417 b[14][51][0] = 12418 
c    b[14][52][2] = 12419 b[14][52][1] = 12420 b[14][52][0] = 12421 
c    b[14][53][2] = 12422 b[14][53][1] = 12423 b[14][53][0] = 12424 
c    b[14][54][2] = 12425 b[14][54][1] = 12426 b[14][54][0] = 12427 
c    b[14][55][2] = 12428 b[14][55][1] = 12429 b[14][55][0] = 12430 
c    b[14][56][2] = 12431 b[14][56][1] = 12432 b[14][56][0] = 12433 
c    b[14][57][2] = 12434 b[14][57][1] = 12435 b[14][57][0] = 12436 
c    b[14][58][2] = 12437 b[14][58][1] = 12438 b[14][58][0] = 12439 
c    b[14][59][2] = 12440 b[14][59][1] = 12441 b[14][59][0] = 12442 
c    b[14][60][2] = 12443 b[14][60][1] = 12444 b[14][60][0] = 12445 
c    b[14][61][2] = 12446 b[14][61][1] = 12447 b[14][61][0] = 12448 
c    b[14][62][2] = 12449 b[14][62][1] = 12450 b[14][62][0] = 12451 
c    b[14][63][2] = 12452 b[14][63][1] = 12453 b[14][63][0] = 12454 
c    b[14][64][2] = 12455 b[14][64][1] = 12456 b[14][64][0] = 12457 
c    b[14][65][2] = 12458 b[14][65][1] = 12459 b[14][65][0] = 12460 
c    b[14][66][2] = 12461 b[14][66][1] = 12462 b[14][66][0] = 12463 
c    b[14][67][2] = 12464 b[14][67][1] = 12465 b[14][67][0] = 12466 
c    b[14][68][2] = 12467 b[14][68][1] = 12468 b[14][68][0] = 12469 
c    b[14][69][2] = 12470 b[14][69][1] = 12471 b[14][69][0] = 12472 
c    b[14][70][2] = 12473 b[14][70][1] = 12474 b[14][70][0] = 12475 
c    b[14][71][2] = 12476 b[14][71][1] = 12477 b[14][71][0] = 12478 
c    b[14][72][2] = 12479 b[14][72][1] = 12480 b[14][72][0] = 12481 
c    b[14][73][2] = 12482 b[14][73][1] = 12483 b[14][73][0] = 12484 
c    b[14][74][2] = 12485 b[14][74][1] = 12486 b[14][74][0] = 12487 
c    b[14][75][2] = 12488 b[14][75][1] = 12489 b[14][75][0] = 12490 
c    b[14][76][2] = 12491 b[14][76][1] = 12492 b[14][76][0] = 12493 
c    b[14][77][2] = 12494 b[14][77][1] = 12495 b[14][77][0] = 12496 
c    b[14][78][2] = 12497 b[14][78][1] = 12498 b[14][78][0] = 12499 
c    b[14][79][2] = 12500 b[14][79][1] = 12501 b[14][79][0] = 12502 
c    b[14][80][2] = 12503 b[14][80][1] = 12504 b[14][80][0] = 12505 
c    b[14][81][2] = 12506 b[14][81][1] = 12507 b[14][81][0] = 12508 
c    b[14][82][2] = 12509 b[14][82][1] = 12510 b[14][82][0] = 12511 
c    b[14][83][2] = 12512 b[14][83][1] = 12513 b[14][83][0] = 12514 

c    b[15][1][2] = 12515 b[15][1][1] = 12516 b[15][1][0] = 12517 
c    b[15][2][2] = 12518 b[15][2][1] = 12519 b[15][2][0] = 12520 
c    b[15][3][2] = 12521 b[15][3][1] = 12522 b[15][3][0] = 12523 
c    b[15][4][2] = 12524 b[15][4][1] = 12525 b[15][4][0] = 12526 
c    b[15][5][2] = 12527 b[15][5][1] = 12528 b[15][5][0] = 12529 
c    b[15][6][2] = 12530 b[15][6][1] = 12531 b[15][6][0] = 12532 
c    b[15][7][2] = 12533 b[15][7][1] = 12534 b[15][7][0] = 12535 
c    b[15][8][2] = 12536 b[15][8][1] = 12537 b[15][8][0] = 12538 
c    b[15][9][2] = 12539 b[15][9][1] = 12540 b[15][9][0] = 12541 
c    b[15][10][2] = 12542 b[15][10][1] = 12543 b[15][10][0] = 12544 
c    b[15][11][2] = 12545 b[15][11][1] = 12546 b[15][11][0] = 12547 
c    b[15][12][2] = 12548 b[15][12][1] = 12549 b[15][12][0] = 12550 
c    b[15][13][2] = 12551 b[15][13][1] = 12552 b[15][13][0] = 12553 
c    b[15][14][2] = 12554 b[15][14][1] = 12555 b[15][14][0] = 12556 
c    b[15][15][2] = 12557 b[15][15][1] = 12558 b[15][15][0] = 12559 
c    b[15][16][2] = 12560 b[15][16][1] = 12561 b[15][16][0] = 12562 
c    b[15][17][2] = 12563 b[15][17][1] = 12564 b[15][17][0] = 12565 
c    b[15][18][2] = 12566 b[15][18][1] = 12567 b[15][18][0] = 12568 
c    b[15][19][2] = 12569 b[15][19][1] = 12570 b[15][19][0] = 12571 
c    b[15][20][2] = 12572 b[15][20][1] = 12573 b[15][20][0] = 12574 
c    b[15][21][2] = 12575 b[15][21][1] = 12576 b[15][21][0] = 12577 
c    b[15][22][2] = 12578 b[15][22][1] = 12579 b[15][22][0] = 12580 
c    b[15][23][2] = 12581 b[15][23][1] = 12582 b[15][23][0] = 12583 
c    b[15][24][2] = 12584 b[15][24][1] = 12585 b[15][24][0] = 12586 
c    b[15][25][2] = 12587 b[15][25][1] = 12588 b[15][25][0] = 12589 
c    b[15][26][2] = 12590 b[15][26][1] = 12591 b[15][26][0] = 12592 
c    b[15][27][2] = 12593 b[15][27][1] = 12594 b[15][27][0] = 12595 
c    b[15][28][2] = 12596 b[15][28][1] = 12597 b[15][28][0] = 12598 
c    b[15][29][2] = 12599 b[15][29][1] = 12600 b[15][29][0] = 12601 
c    b[15][30][2] = 12602 b[15][30][1] = 12603 b[15][30][0] = 12604 
c    b[15][31][2] = 12605 b[15][31][1] = 12606 b[15][31][0] = 12607 
c    b[15][32][2] = 12608 b[15][32][1] = 12609 b[15][32][0] = 12610 
c    b[15][33][2] = 12611 b[15][33][1] = 12612 b[15][33][0] = 12613 
c    b[15][34][2] = 12614 b[15][34][1] = 12615 b[15][34][0] = 12616 
c    b[15][35][2] = 12617 b[15][35][1] = 12618 b[15][35][0] = 12619 
c    b[15][36][2] = 12620 b[15][36][1] = 12621 b[15][36][0] = 12622 
c    b[15][37][2] = 12623 b[15][37][1] = 12624 b[15][37][0] = 12625 
c    b[15][38][2] = 12626 b[15][38][1] = 12627 b[15][38][0] = 12628 
c    b[15][39][2] = 12629 b[15][39][1] = 12630 b[15][39][0] = 12631 
c    b[15][40][2] = 12632 b[15][40][1] = 12633 b[15][40][0] = 12634 
c    b[15][41][2] = 12635 b[15][41][1] = 12636 b[15][41][0] = 12637 
c    b[15][42][2] = 12638 b[15][42][1] = 12639 b[15][42][0] = 12640 
c    b[15][43][2] = 12641 b[15][43][1] = 12642 b[15][43][0] = 12643 
c    b[15][44][2] = 12644 b[15][44][1] = 12645 b[15][44][0] = 12646 
c    b[15][45][2] = 12647 b[15][45][1] = 12648 b[15][45][0] = 12649 
c    b[15][46][2] = 12650 b[15][46][1] = 12651 b[15][46][0] = 12652 
c    b[15][47][2] = 12653 b[15][47][1] = 12654 b[15][47][0] = 12655 
c    b[15][48][2] = 12656 b[15][48][1] = 12657 b[15][48][0] = 12658 
c    b[15][49][2] = 12659 b[15][49][1] = 12660 b[15][49][0] = 12661 
c    b[15][50][2] = 12662 b[15][50][1] = 12663 b[15][50][0] = 12664 
c    b[15][51][2] = 12665 b[15][51][1] = 12666 b[15][51][0] = 12667 
c    b[15][52][2] = 12668 b[15][52][1] = 12669 b[15][52][0] = 12670 
c    b[15][53][2] = 12671 b[15][53][1] = 12672 b[15][53][0] = 12673 
c    b[15][54][2] = 12674 b[15][54][1] = 12675 b[15][54][0] = 12676 
c    b[15][55][2] = 12677 b[15][55][1] = 12678 b[15][55][0] = 12679 
c    b[15][56][2] = 12680 b[15][56][1] = 12681 b[15][56][0] = 12682 
c    b[15][57][2] = 12683 b[15][57][1] = 12684 b[15][57][0] = 12685 
c    b[15][58][2] = 12686 b[15][58][1] = 12687 b[15][58][0] = 12688 
c    b[15][59][2] = 12689 b[15][59][1] = 12690 b[15][59][0] = 12691 
c    b[15][60][2] = 12692 b[15][60][1] = 12693 b[15][60][0] = 12694 
c    b[15][61][2] = 12695 b[15][61][1] = 12696 b[15][61][0] = 12697 
c    b[15][62][2] = 12698 b[15][62][1] = 12699 b[15][62][0] = 12700 
c    b[15][63][2] = 12701 b[15][63][1] = 12702 b[15][63][0] = 12703 
c    b[15][64][2] = 12704 b[15][64][1] = 12705 b[15][64][0] = 12706 
c    b[15][65][2] = 12707 b[15][65][1] = 12708 b[15][65][0] = 12709 
c    b[15][66][2] = 12710 b[15][66][1] = 12711 b[15][66][0] = 12712 
c    b[15][67][2] = 12713 b[15][67][1] = 12714 b[15][67][0] = 12715 
c    b[15][68][2] = 12716 b[15][68][1] = 12717 b[15][68][0] = 12718 
c    b[15][69][2] = 12719 b[15][69][1] = 12720 b[15][69][0] = 12721 
c    b[15][70][2] = 12722 b[15][70][1] = 12723 b[15][70][0] = 12724 
c    b[15][71][2] = 12725 b[15][71][1] = 12726 b[15][71][0] = 12727 
c    b[15][72][2] = 12728 b[15][72][1] = 12729 b[15][72][0] = 12730 
c    b[15][73][2] = 12731 b[15][73][1] = 12732 b[15][73][0] = 12733 
c    b[15][74][2] = 12734 b[15][74][1] = 12735 b[15][74][0] = 12736 
c    b[15][75][2] = 12737 b[15][75][1] = 12738 b[15][75][0] = 12739 
c    b[15][76][2] = 12740 b[15][76][1] = 12741 b[15][76][0] = 12742 
c    b[15][77][2] = 12743 b[15][77][1] = 12744 b[15][77][0] = 12745 
c    b[15][78][2] = 12746 b[15][78][1] = 12747 b[15][78][0] = 12748 

c    b[16][1][2] = 12749 b[16][1][1] = 12750 b[16][1][0] = 12751 
c    b[16][2][2] = 12752 b[16][2][1] = 12753 b[16][2][0] = 12754 
c    b[16][3][2] = 12755 b[16][3][1] = 12756 b[16][3][0] = 12757 
c    b[16][4][2] = 12758 b[16][4][1] = 12759 b[16][4][0] = 12760 
c    b[16][5][2] = 12761 b[16][5][1] = 12762 b[16][5][0] = 12763 
c    b[16][6][2] = 12764 b[16][6][1] = 12765 b[16][6][0] = 12766 
c    b[16][7][2] = 12767 b[16][7][1] = 12768 b[16][7][0] = 12769 
c    b[16][8][2] = 12770 b[16][8][1] = 12771 b[16][8][0] = 12772 
c    b[16][9][2] = 12773 b[16][9][1] = 12774 b[16][9][0] = 12775 
c    b[16][10][2] = 12776 b[16][10][1] = 12777 b[16][10][0] = 12778 
c    b[16][11][2] = 12779 b[16][11][1] = 12780 b[16][11][0] = 12781 
c    b[16][12][2] = 12782 b[16][12][1] = 12783 b[16][12][0] = 12784 
c    b[16][13][2] = 12785 b[16][13][1] = 12786 b[16][13][0] = 12787 
c    b[16][14][2] = 12788 b[16][14][1] = 12789 b[16][14][0] = 12790 
c    b[16][15][2] = 12791 b[16][15][1] = 12792 b[16][15][0] = 12793 
c    b[16][16][2] = 12794 b[16][16][1] = 12795 b[16][16][0] = 12796 
c    b[16][17][2] = 12797 b[16][17][1] = 12798 b[16][17][0] = 12799 
c    b[16][18][2] = 12800 b[16][18][1] = 12801 b[16][18][0] = 12802 
c    b[16][19][2] = 12803 b[16][19][1] = 12804 b[16][19][0] = 12805 
c    b[16][20][2] = 12806 b[16][20][1] = 12807 b[16][20][0] = 12808 
c    b[16][21][2] = 12809 b[16][21][1] = 12810 b[16][21][0] = 12811 
c    b[16][22][2] = 12812 b[16][22][1] = 12813 b[16][22][0] = 12814 
c    b[16][23][2] = 12815 b[16][23][1] = 12816 b[16][23][0] = 12817 
c    b[16][24][2] = 12818 b[16][24][1] = 12819 b[16][24][0] = 12820 
c    b[16][25][2] = 12821 b[16][25][1] = 12822 b[16][25][0] = 12823 
c    b[16][26][2] = 12824 b[16][26][1] = 12825 b[16][26][0] = 12826 
c    b[16][27][2] = 12827 b[16][27][1] = 12828 b[16][27][0] = 12829 
c    b[16][28][2] = 12830 b[16][28][1] = 12831 b[16][28][0] = 12832 
c    b[16][29][2] = 12833 b[16][29][1] = 12834 b[16][29][0] = 12835 
c    b[16][30][2] = 12836 b[16][30][1] = 12837 b[16][30][0] = 12838 
c    b[16][31][2] = 12839 b[16][31][1] = 12840 b[16][31][0] = 12841 
c    b[16][32][2] = 12842 b[16][32][1] = 12843 b[16][32][0] = 12844 
c    b[16][33][2] = 12845 b[16][33][1] = 12846 b[16][33][0] = 12847 
c    b[16][34][2] = 12848 b[16][34][1] = 12849 b[16][34][0] = 12850 
c    b[16][35][2] = 12851 b[16][35][1] = 12852 b[16][35][0] = 12853 
c    b[16][36][2] = 12854 b[16][36][1] = 12855 b[16][36][0] = 12856 
c    b[16][37][2] = 12857 b[16][37][1] = 12858 b[16][37][0] = 12859 
c    b[16][38][2] = 12860 b[16][38][1] = 12861 b[16][38][0] = 12862 
c    b[16][39][2] = 12863 b[16][39][1] = 12864 b[16][39][0] = 12865 
c    b[16][40][2] = 12866 b[16][40][1] = 12867 b[16][40][0] = 12868 
c    b[16][41][2] = 12869 b[16][41][1] = 12870 b[16][41][0] = 12871 
c    b[16][42][2] = 12872 b[16][42][1] = 12873 b[16][42][0] = 12874 
c    b[16][43][2] = 12875 b[16][43][1] = 12876 b[16][43][0] = 12877 
c    b[16][44][2] = 12878 b[16][44][1] = 12879 b[16][44][0] = 12880 
c    b[16][45][2] = 12881 b[16][45][1] = 12882 b[16][45][0] = 12883 
c    b[16][46][2] = 12884 b[16][46][1] = 12885 b[16][46][0] = 12886 
c    b[16][47][2] = 12887 b[16][47][1] = 12888 b[16][47][0] = 12889 
c    b[16][48][2] = 12890 b[16][48][1] = 12891 b[16][48][0] = 12892 
c    b[16][49][2] = 12893 b[16][49][1] = 12894 b[16][49][0] = 12895 
c    b[16][50][2] = 12896 b[16][50][1] = 12897 b[16][50][0] = 12898 
c    b[16][51][2] = 12899 b[16][51][1] = 12900 b[16][51][0] = 12901 
c    b[16][52][2] = 12902 b[16][52][1] = 12903 b[16][52][0] = 12904 
c    b[16][53][2] = 12905 b[16][53][1] = 12906 b[16][53][0] = 12907 
c    b[16][54][2] = 12908 b[16][54][1] = 12909 b[16][54][0] = 12910 
c    b[16][55][2] = 12911 b[16][55][1] = 12912 b[16][55][0] = 12913 
c    b[16][56][2] = 12914 b[16][56][1] = 12915 b[16][56][0] = 12916 
c    b[16][57][2] = 12917 b[16][57][1] = 12918 b[16][57][0] = 12919 
c    b[16][58][2] = 12920 b[16][58][1] = 12921 b[16][58][0] = 12922 
c    b[16][59][2] = 12923 b[16][59][1] = 12924 b[16][59][0] = 12925 
c    b[16][60][2] = 12926 b[16][60][1] = 12927 b[16][60][0] = 12928 
c    b[16][61][2] = 12929 b[16][61][1] = 12930 b[16][61][0] = 12931 
c    b[16][62][2] = 12932 b[16][62][1] = 12933 b[16][62][0] = 12934 
c    b[16][63][2] = 12935 b[16][63][1] = 12936 b[16][63][0] = 12937 
c    b[16][64][2] = 12938 b[16][64][1] = 12939 b[16][64][0] = 12940 
c    b[16][65][2] = 12941 b[16][65][1] = 12942 b[16][65][0] = 12943 
c    b[16][66][2] = 12944 b[16][66][1] = 12945 b[16][66][0] = 12946 
c    b[16][67][2] = 12947 b[16][67][1] = 12948 b[16][67][0] = 12949 
c    b[16][68][2] = 12950 b[16][68][1] = 12951 b[16][68][0] = 12952 
c    b[16][69][2] = 12953 b[16][69][1] = 12954 b[16][69][0] = 12955 
c    b[16][70][2] = 12956 b[16][70][1] = 12957 b[16][70][0] = 12958 
c    b[16][71][2] = 12959 b[16][71][1] = 12960 b[16][71][0] = 12961 
c    b[16][72][2] = 12962 b[16][72][1] = 12963 b[16][72][0] = 12964 
c    b[16][73][2] = 12965 b[16][73][1] = 12966 b[16][73][0] = 12967 

c    b[17][1][2] = 12968 b[17][1][1] = 12969 b[17][1][0] = 12970 
c    b[17][2][2] = 12971 b[17][2][1] = 12972 b[17][2][0] = 12973 
c    b[17][3][2] = 12974 b[17][3][1] = 12975 b[17][3][0] = 12976 
c    b[17][4][2] = 12977 b[17][4][1] = 12978 b[17][4][0] = 12979 
c    b[17][5][2] = 12980 b[17][5][1] = 12981 b[17][5][0] = 12982 
c    b[17][6][2] = 12983 b[17][6][1] = 12984 b[17][6][0] = 12985 
c    b[17][7][2] = 12986 b[17][7][1] = 12987 b[17][7][0] = 12988 
c    b[17][8][2] = 12989 b[17][8][1] = 12990 b[17][8][0] = 12991 
c    b[17][9][2] = 12992 b[17][9][1] = 12993 b[17][9][0] = 12994 
c    b[17][10][2] = 12995 b[17][10][1] = 12996 b[17][10][0] = 12997 
c    b[17][11][2] = 12998 b[17][11][1] = 12999 b[17][11][0] = 13000 
c    b[17][12][2] = 13001 b[17][12][1] = 13002 b[17][12][0] = 13003 
c    b[17][13][2] = 13004 b[17][13][1] = 13005 b[17][13][0] = 13006 
c    b[17][14][2] = 13007 b[17][14][1] = 13008 b[17][14][0] = 13009 
c    b[17][15][2] = 13010 b[17][15][1] = 13011 b[17][15][0] = 13012 
c    b[17][16][2] = 13013 b[17][16][1] = 13014 b[17][16][0] = 13015 
c    b[17][17][2] = 13016 b[17][17][1] = 13017 b[17][17][0] = 13018 
c    b[17][18][2] = 13019 b[17][18][1] = 13020 b[17][18][0] = 13021 
c    b[17][19][2] = 13022 b[17][19][1] = 13023 b[17][19][0] = 13024 
c    b[17][20][2] = 13025 b[17][20][1] = 13026 b[17][20][0] = 13027 
c    b[17][21][2] = 13028 b[17][21][1] = 13029 b[17][21][0] = 13030 
c    b[17][22][2] = 13031 b[17][22][1] = 13032 b[17][22][0] = 13033 
c    b[17][23][2] = 13034 b[17][23][1] = 13035 b[17][23][0] = 13036 
c    b[17][24][2] = 13037 b[17][24][1] = 13038 b[17][24][0] = 13039 
c    b[17][25][2] = 13040 b[17][25][1] = 13041 b[17][25][0] = 13042 
c    b[17][26][2] = 13043 b[17][26][1] = 13044 b[17][26][0] = 13045 
c    b[17][27][2] = 13046 b[17][27][1] = 13047 b[17][27][0] = 13048 
c    b[17][28][2] = 13049 b[17][28][1] = 13050 b[17][28][0] = 13051 
c    b[17][29][2] = 13052 b[17][29][1] = 13053 b[17][29][0] = 13054 
c    b[17][30][2] = 13055 b[17][30][1] = 13056 b[17][30][0] = 13057 
c    b[17][31][2] = 13058 b[17][31][1] = 13059 b[17][31][0] = 13060 
c    b[17][32][2] = 13061 b[17][32][1] = 13062 b[17][32][0] = 13063 
c    b[17][33][2] = 13064 b[17][33][1] = 13065 b[17][33][0] = 13066 
c    b[17][34][2] = 13067 b[17][34][1] = 13068 b[17][34][0] = 13069 
c    b[17][35][2] = 13070 b[17][35][1] = 13071 b[17][35][0] = 13072 
c    b[17][36][2] = 13073 b[17][36][1] = 13074 b[17][36][0] = 13075 
c    b[17][37][2] = 13076 b[17][37][1] = 13077 b[17][37][0] = 13078 
c    b[17][38][2] = 13079 b[17][38][1] = 13080 b[17][38][0] = 13081 
c    b[17][39][2] = 13082 b[17][39][1] = 13083 b[17][39][0] = 13084 
c    b[17][40][2] = 13085 b[17][40][1] = 13086 b[17][40][0] = 13087 
c    b[17][41][2] = 13088 b[17][41][1] = 13089 b[17][41][0] = 13090 
c    b[17][42][2] = 13091 b[17][42][1] = 13092 b[17][42][0] = 13093 
c    b[17][43][2] = 13094 b[17][43][1] = 13095 b[17][43][0] = 13096 
c    b[17][44][2] = 13097 b[17][44][1] = 13098 b[17][44][0] = 13099 
c    b[17][45][2] = 13100 b[17][45][1] = 13101 b[17][45][0] = 13102 
c    b[17][46][2] = 13103 b[17][46][1] = 13104 b[17][46][0] = 13105 
c    b[17][47][2] = 13106 b[17][47][1] = 13107 b[17][47][0] = 13108 
c    b[17][48][2] = 13109 b[17][48][1] = 13110 b[17][48][0] = 13111 
c    b[17][49][2] = 13112 b[17][49][1] = 13113 b[17][49][0] = 13114 
c    b[17][50][2] = 13115 b[17][50][1] = 13116 b[17][50][0] = 13117 
c    b[17][51][2] = 13118 b[17][51][1] = 13119 b[17][51][0] = 13120 
c    b[17][52][2] = 13121 b[17][52][1] = 13122 b[17][52][0] = 13123 
c    b[17][53][2] = 13124 b[17][53][1] = 13125 b[17][53][0] = 13126 
c    b[17][54][2] = 13127 b[17][54][1] = 13128 b[17][54][0] = 13129 
c    b[17][55][2] = 13130 b[17][55][1] = 13131 b[17][55][0] = 13132 
c    b[17][56][2] = 13133 b[17][56][1] = 13134 b[17][56][0] = 13135 
c    b[17][57][2] = 13136 b[17][57][1] = 13137 b[17][57][0] = 13138 
c    b[17][58][2] = 13139 b[17][58][1] = 13140 b[17][58][0] = 13141 
c    b[17][59][2] = 13142 b[17][59][1] = 13143 b[17][59][0] = 13144 
c    b[17][60][2] = 13145 b[17][60][1] = 13146 b[17][60][0] = 13147 
c    b[17][61][2] = 13148 b[17][61][1] = 13149 b[17][61][0] = 13150 
c    b[17][62][2] = 13151 b[17][62][1] = 13152 b[17][62][0] = 13153 
c    b[17][63][2] = 13154 b[17][63][1] = 13155 b[17][63][0] = 13156 
c    b[17][64][2] = 13157 b[17][64][1] = 13158 b[17][64][0] = 13159 
c    b[17][65][2] = 13160 b[17][65][1] = 13161 b[17][65][0] = 13162 
c    b[17][66][2] = 13163 b[17][66][1] = 13164 b[17][66][0] = 13165 
c    b[17][67][2] = 13166 b[17][67][1] = 13167 b[17][67][0] = 13168 
c    b[17][68][2] = 13169 b[17][68][1] = 13170 b[17][68][0] = 13171 
c    b[17][69][2] = 13172 b[17][69][1] = 13173 b[17][69][0] = 13174 

c    b[18][1][2] = 13175 b[18][1][1] = 13176 b[18][1][0] = 13177 
c    b[18][2][2] = 13178 b[18][2][1] = 13179 b[18][2][0] = 13180 
c    b[18][3][2] = 13181 b[18][3][1] = 13182 b[18][3][0] = 13183 
c    b[18][4][2] = 13184 b[18][4][1] = 13185 b[18][4][0] = 13186 
c    b[18][5][2] = 13187 b[18][5][1] = 13188 b[18][5][0] = 13189 
c    b[18][6][2] = 13190 b[18][6][1] = 13191 b[18][6][0] = 13192 
c    b[18][7][2] = 13193 b[18][7][1] = 13194 b[18][7][0] = 13195 
c    b[18][8][2] = 13196 b[18][8][1] = 13197 b[18][8][0] = 13198 
c    b[18][9][2] = 13199 b[18][9][1] = 13200 b[18][9][0] = 13201 
c    b[18][10][2] = 13202 b[18][10][1] = 13203 b[18][10][0] = 13204 
c    b[18][11][2] = 13205 b[18][11][1] = 13206 b[18][11][0] = 13207 
c    b[18][12][2] = 13208 b[18][12][1] = 13209 b[18][12][0] = 13210 
c    b[18][13][2] = 13211 b[18][13][1] = 13212 b[18][13][0] = 13213 
c    b[18][14][2] = 13214 b[18][14][1] = 13215 b[18][14][0] = 13216 
c    b[18][15][2] = 13217 b[18][15][1] = 13218 b[18][15][0] = 13219 
c    b[18][16][2] = 13220 b[18][16][1] = 13221 b[18][16][0] = 13222 
c    b[18][17][2] = 13223 b[18][17][1] = 13224 b[18][17][0] = 13225 
c    b[18][18][2] = 13226 b[18][18][1] = 13227 b[18][18][0] = 13228 
c    b[18][19][2] = 13229 b[18][19][1] = 13230 b[18][19][0] = 13231 
c    b[18][20][2] = 13232 b[18][20][1] = 13233 b[18][20][0] = 13234 
c    b[18][21][2] = 13235 b[18][21][1] = 13236 b[18][21][0] = 13237 
c    b[18][22][2] = 13238 b[18][22][1] = 13239 b[18][22][0] = 13240 
c    b[18][23][2] = 13241 b[18][23][1] = 13242 b[18][23][0] = 13243 
c    b[18][24][2] = 13244 b[18][24][1] = 13245 b[18][24][0] = 13246 
c    b[18][25][2] = 13247 b[18][25][1] = 13248 b[18][25][0] = 13249 
c    b[18][26][2] = 13250 b[18][26][1] = 13251 b[18][26][0] = 13252 
c    b[18][27][2] = 13253 b[18][27][1] = 13254 b[18][27][0] = 13255 
c    b[18][28][2] = 13256 b[18][28][1] = 13257 b[18][28][0] = 13258 
c    b[18][29][2] = 13259 b[18][29][1] = 13260 b[18][29][0] = 13261 
c    b[18][30][2] = 13262 b[18][30][1] = 13263 b[18][30][0] = 13264 
c    b[18][31][2] = 13265 b[18][31][1] = 13266 b[18][31][0] = 13267 
c    b[18][32][2] = 13268 b[18][32][1] = 13269 b[18][32][0] = 13270 
c    b[18][33][2] = 13271 b[18][33][1] = 13272 b[18][33][0] = 13273 
c    b[18][34][2] = 13274 b[18][34][1] = 13275 b[18][34][0] = 13276 
c    b[18][35][2] = 13277 b[18][35][1] = 13278 b[18][35][0] = 13279 
c    b[18][36][2] = 13280 b[18][36][1] = 13281 b[18][36][0] = 13282 
c    b[18][37][2] = 13283 b[18][37][1] = 13284 b[18][37][0] = 13285 
c    b[18][38][2] = 13286 b[18][38][1] = 13287 b[18][38][0] = 13288 
c    b[18][39][2] = 13289 b[18][39][1] = 13290 b[18][39][0] = 13291 
c    b[18][40][2] = 13292 b[18][40][1] = 13293 b[18][40][0] = 13294 
c    b[18][41][2] = 13295 b[18][41][1] = 13296 b[18][41][0] = 13297 
c    b[18][42][2] = 13298 b[18][42][1] = 13299 b[18][42][0] = 13300 
c    b[18][43][2] = 13301 b[18][43][1] = 13302 b[18][43][0] = 13303 
c    b[18][44][2] = 13304 b[18][44][1] = 13305 b[18][44][0] = 13306 
c    b[18][45][2] = 13307 b[18][45][1] = 13308 b[18][45][0] = 13309 
c    b[18][46][2] = 13310 b[18][46][1] = 13311 b[18][46][0] = 13312 
c    b[18][47][2] = 13313 b[18][47][1] = 13314 b[18][47][0] = 13315 
c    b[18][48][2] = 13316 b[18][48][1] = 13317 b[18][48][0] = 13318 
c    b[18][49][2] = 13319 b[18][49][1] = 13320 b[18][49][0] = 13321 
c    b[18][50][2] = 13322 b[18][50][1] = 13323 b[18][50][0] = 13324 
c    b[18][51][2] = 13325 b[18][51][1] = 13326 b[18][51][0] = 13327 
c    b[18][52][2] = 13328 b[18][52][1] = 13329 b[18][52][0] = 13330 
c    b[18][53][2] = 13331 b[18][53][1] = 13332 b[18][53][0] = 13333 
c    b[18][54][2] = 13334 b[18][54][1] = 13335 b[18][54][0] = 13336 
c    b[18][55][2] = 13337 b[18][55][1] = 13338 b[18][55][0] = 13339 
c    b[18][56][2] = 13340 b[18][56][1] = 13341 b[18][56][0] = 13342 
c    b[18][57][2] = 13343 b[18][57][1] = 13344 b[18][57][0] = 13345 
c    b[18][58][2] = 13346 b[18][58][1] = 13347 b[18][58][0] = 13348 
c    b[18][59][2] = 13349 b[18][59][1] = 13350 b[18][59][0] = 13351 
c    b[18][60][2] = 13352 b[18][60][1] = 13353 b[18][60][0] = 13354 
c    b[18][61][2] = 13355 b[18][61][1] = 13356 b[18][61][0] = 13357 
c    b[18][62][2] = 13358 b[18][62][1] = 13359 b[18][62][0] = 13360 
c    b[18][63][2] = 13361 b[18][63][1] = 13362 b[18][63][0] = 13363 
c    b[18][64][2] = 13364 b[18][64][1] = 13365 b[18][64][0] = 13366 
c    b[18][65][2] = 13367 b[18][65][1] = 13368 b[18][65][0] = 13369 

c    b[19][1][2] = 13370 b[19][1][1] = 13371 b[19][1][0] = 13372 
c    b[19][2][2] = 13373 b[19][2][1] = 13374 b[19][2][0] = 13375 
c    b[19][3][2] = 13376 b[19][3][1] = 13377 b[19][3][0] = 13378 
c    b[19][4][2] = 13379 b[19][4][1] = 13380 b[19][4][0] = 13381 
c    b[19][5][2] = 13382 b[19][5][1] = 13383 b[19][5][0] = 13384 
c    b[19][6][2] = 13385 b[19][6][1] = 13386 b[19][6][0] = 13387 
c    b[19][7][2] = 13388 b[19][7][1] = 13389 b[19][7][0] = 13390 
c    b[19][8][2] = 13391 b[19][8][1] = 13392 b[19][8][0] = 13393 
c    b[19][9][2] = 13394 b[19][9][1] = 13395 b[19][9][0] = 13396 
c    b[19][10][2] = 13397 b[19][10][1] = 13398 b[19][10][0] = 13399 
c    b[19][11][2] = 13400 b[19][11][1] = 13401 b[19][11][0] = 13402 
c    b[19][12][2] = 13403 b[19][12][1] = 13404 b[19][12][0] = 13405 
c    b[19][13][2] = 13406 b[19][13][1] = 13407 b[19][13][0] = 13408 
c    b[19][14][2] = 13409 b[19][14][1] = 13410 b[19][14][0] = 13411 
c    b[19][15][2] = 13412 b[19][15][1] = 13413 b[19][15][0] = 13414 
c    b[19][16][2] = 13415 b[19][16][1] = 13416 b[19][16][0] = 13417 
c    b[19][17][2] = 13418 b[19][17][1] = 13419 b[19][17][0] = 13420 
c    b[19][18][2] = 13421 b[19][18][1] = 13422 b[19][18][0] = 13423 
c    b[19][19][2] = 13424 b[19][19][1] = 13425 b[19][19][0] = 13426 
c    b[19][20][2] = 13427 b[19][20][1] = 13428 b[19][20][0] = 13429 
c    b[19][21][2] = 13430 b[19][21][1] = 13431 b[19][21][0] = 13432 
c    b[19][22][2] = 13433 b[19][22][1] = 13434 b[19][22][0] = 13435 
c    b[19][23][2] = 13436 b[19][23][1] = 13437 b[19][23][0] = 13438 
c    b[19][24][2] = 13439 b[19][24][1] = 13440 b[19][24][0] = 13441 
c    b[19][25][2] = 13442 b[19][25][1] = 13443 b[19][25][0] = 13444 
c    b[19][26][2] = 13445 b[19][26][1] = 13446 b[19][26][0] = 13447 
c    b[19][27][2] = 13448 b[19][27][1] = 13449 b[19][27][0] = 13450 
c    b[19][28][2] = 13451 b[19][28][1] = 13452 b[19][28][0] = 13453 
c    b[19][29][2] = 13454 b[19][29][1] = 13455 b[19][29][0] = 13456 
c    b[19][30][2] = 13457 b[19][30][1] = 13458 b[19][30][0] = 13459 
c    b[19][31][2] = 13460 b[19][31][1] = 13461 b[19][31][0] = 13462 
c    b[19][32][2] = 13463 b[19][32][1] = 13464 b[19][32][0] = 13465 
c    b[19][33][2] = 13466 b[19][33][1] = 13467 b[19][33][0] = 13468 
c    b[19][34][2] = 13469 b[19][34][1] = 13470 b[19][34][0] = 13471 
c    b[19][35][2] = 13472 b[19][35][1] = 13473 b[19][35][0] = 13474 
c    b[19][36][2] = 13475 b[19][36][1] = 13476 b[19][36][0] = 13477 
c    b[19][37][2] = 13478 b[19][37][1] = 13479 b[19][37][0] = 13480 
c    b[19][38][2] = 13481 b[19][38][1] = 13482 b[19][38][0] = 13483 
c    b[19][39][2] = 13484 b[19][39][1] = 13485 b[19][39][0] = 13486 
c    b[19][40][2] = 13487 b[19][40][1] = 13488 b[19][40][0] = 13489 
c    b[19][41][2] = 13490 b[19][41][1] = 13491 b[19][41][0] = 13492 
c    b[19][42][2] = 13493 b[19][42][1] = 13494 b[19][42][0] = 13495 
c    b[19][43][2] = 13496 b[19][43][1] = 13497 b[19][43][0] = 13498 
c    b[19][44][2] = 13499 b[19][44][1] = 13500 b[19][44][0] = 13501 
c    b[19][45][2] = 13502 b[19][45][1] = 13503 b[19][45][0] = 13504 
c    b[19][46][2] = 13505 b[19][46][1] = 13506 b[19][46][0] = 13507 
c    b[19][47][2] = 13508 b[19][47][1] = 13509 b[19][47][0] = 13510 
c    b[19][48][2] = 13511 b[19][48][1] = 13512 b[19][48][0] = 13513 
c    b[19][49][2] = 13514 b[19][49][1] = 13515 b[19][49][0] = 13516 
c    b[19][50][2] = 13517 b[19][50][1] = 13518 b[19][50][0] = 13519 
c    b[19][51][2] = 13520 b[19][51][1] = 13521 b[19][51][0] = 13522 
c    b[19][52][2] = 13523 b[19][52][1] = 13524 b[19][52][0] = 13525 
c    b[19][53][2] = 13526 b[19][53][1] = 13527 b[19][53][0] = 13528 
c    b[19][54][2] = 13529 b[19][54][1] = 13530 b[19][54][0] = 13531 
c    b[19][55][2] = 13532 b[19][55][1] = 13533 b[19][55][0] = 13534 
c    b[19][56][2] = 13535 b[19][56][1] = 13536 b[19][56][0] = 13537 
c    b[19][57][2] = 13538 b[19][57][1] = 13539 b[19][57][0] = 13540 
c    b[19][58][2] = 13541 b[19][58][1] = 13542 b[19][58][0] = 13543 
c    b[19][59][2] = 13544 b[19][59][1] = 13545 b[19][59][0] = 13546 
c    b[19][60][2] = 13547 b[19][60][1] = 13548 b[19][60][0] = 13549 
c    b[19][61][2] = 13550 b[19][61][1] = 13551 b[19][61][0] = 13552 
c    b[19][62][2] = 13553 b[19][62][1] = 13554 b[19][62][0] = 13555 

c    b[20][1][2] = 13556 b[20][1][1] = 13557 b[20][1][0] = 13558 
c    b[20][2][2] = 13559 b[20][2][1] = 13560 b[20][2][0] = 13561 
c    b[20][3][2] = 13562 b[20][3][1] = 13563 b[20][3][0] = 13564 
c    b[20][4][2] = 13565 b[20][4][1] = 13566 b[20][4][0] = 13567 
c    b[20][5][2] = 13568 b[20][5][1] = 13569 b[20][5][0] = 13570 
c    b[20][6][2] = 13571 b[20][6][1] = 13572 b[20][6][0] = 13573 
c    b[20][7][2] = 13574 b[20][7][1] = 13575 b[20][7][0] = 13576 
c    b[20][8][2] = 13577 b[20][8][1] = 13578 b[20][8][0] = 13579 
c    b[20][9][2] = 13580 b[20][9][1] = 13581 b[20][9][0] = 13582 
c    b[20][10][2] = 13583 b[20][10][1] = 13584 b[20][10][0] = 13585 
c    b[20][11][2] = 13586 b[20][11][1] = 13587 b[20][11][0] = 13588 
c    b[20][12][2] = 13589 b[20][12][1] = 13590 b[20][12][0] = 13591 
c    b[20][13][2] = 13592 b[20][13][1] = 13593 b[20][13][0] = 13594 
c    b[20][14][2] = 13595 b[20][14][1] = 13596 b[20][14][0] = 13597 
c    b[20][15][2] = 13598 b[20][15][1] = 13599 b[20][15][0] = 13600 
c    b[20][16][2] = 13601 b[20][16][1] = 13602 b[20][16][0] = 13603 
c    b[20][17][2] = 13604 b[20][17][1] = 13605 b[20][17][0] = 13606 
c    b[20][18][2] = 13607 b[20][18][1] = 13608 b[20][18][0] = 13609 
c    b[20][19][2] = 13610 b[20][19][1] = 13611 b[20][19][0] = 13612 
c    b[20][20][2] = 13613 b[20][20][1] = 13614 b[20][20][0] = 13615 
c    b[20][21][2] = 13616 b[20][21][1] = 13617 b[20][21][0] = 13618 
c    b[20][22][2] = 13619 b[20][22][1] = 13620 b[20][22][0] = 13621 
c    b[20][23][2] = 13622 b[20][23][1] = 13623 b[20][23][0] = 13624 
c    b[20][24][2] = 13625 b[20][24][1] = 13626 b[20][24][0] = 13627 
c    b[20][25][2] = 13628 b[20][25][1] = 13629 b[20][25][0] = 13630 
c    b[20][26][2] = 13631 b[20][26][1] = 13632 b[20][26][0] = 13633 
c    b[20][27][2] = 13634 b[20][27][1] = 13635 b[20][27][0] = 13636 
c    b[20][28][2] = 13637 b[20][28][1] = 13638 b[20][28][0] = 13639 
c    b[20][29][2] = 13640 b[20][29][1] = 13641 b[20][29][0] = 13642 
c    b[20][30][2] = 13643 b[20][30][1] = 13644 b[20][30][0] = 13645 
c    b[20][31][2] = 13646 b[20][31][1] = 13647 b[20][31][0] = 13648 
c    b[20][32][2] = 13649 b[20][32][1] = 13650 b[20][32][0] = 13651 
c    b[20][33][2] = 13652 b[20][33][1] = 13653 b[20][33][0] = 13654 
c    b[20][34][2] = 13655 b[20][34][1] = 13656 b[20][34][0] = 13657 
c    b[20][35][2] = 13658 b[20][35][1] = 13659 b[20][35][0] = 13660 
c    b[20][36][2] = 13661 b[20][36][1] = 13662 b[20][36][0] = 13663 
c    b[20][37][2] = 13664 b[20][37][1] = 13665 b[20][37][0] = 13666 
c    b[20][38][2] = 13667 b[20][38][1] = 13668 b[20][38][0] = 13669 
c    b[20][39][2] = 13670 b[20][39][1] = 13671 b[20][39][0] = 13672 
c    b[20][40][2] = 13673 b[20][40][1] = 13674 b[20][40][0] = 13675 
c    b[20][41][2] = 13676 b[20][41][1] = 13677 b[20][41][0] = 13678 
c    b[20][42][2] = 13679 b[20][42][1] = 13680 b[20][42][0] = 13681 
c    b[20][43][2] = 13682 b[20][43][1] = 13683 b[20][43][0] = 13684 
c    b[20][44][2] = 13685 b[20][44][1] = 13686 b[20][44][0] = 13687 
c    b[20][45][2] = 13688 b[20][45][1] = 13689 b[20][45][0] = 13690 
c    b[20][46][2] = 13691 b[20][46][1] = 13692 b[20][46][0] = 13693 
c    b[20][47][2] = 13694 b[20][47][1] = 13695 b[20][47][0] = 13696 
c    b[20][48][2] = 13697 b[20][48][1] = 13698 b[20][48][0] = 13699 
c    b[20][49][2] = 13700 b[20][49][1] = 13701 b[20][49][0] = 13702 
c    b[20][50][2] = 13703 b[20][50][1] = 13704 b[20][50][0] = 13705 
c    b[20][51][2] = 13706 b[20][51][1] = 13707 b[20][51][0] = 13708 
c    b[20][52][2] = 13709 b[20][52][1] = 13710 b[20][52][0] = 13711 
c    b[20][53][2] = 13712 b[20][53][1] = 13713 b[20][53][0] = 13714 
c    b[20][54][2] = 13715 b[20][54][1] = 13716 b[20][54][0] = 13717 
c    b[20][55][2] = 13718 b[20][55][1] = 13719 b[20][55][0] = 13720 
c    b[20][56][2] = 13721 b[20][56][1] = 13722 b[20][56][0] = 13723 
c    b[20][57][2] = 13724 b[20][57][1] = 13725 b[20][57][0] = 13726 
c    b[20][58][2] = 13727 b[20][58][1] = 13728 b[20][58][0] = 13729 
c    b[20][59][2] = 13730 b[20][59][1] = 13731 b[20][59][0] = 13732 

c    b[21][1][2] = 13733 b[21][1][1] = 13734 b[21][1][0] = 13735 
c    b[21][2][2] = 13736 b[21][2][1] = 13737 b[21][2][0] = 13738 
c    b[21][3][2] = 13739 b[21][3][1] = 13740 b[21][3][0] = 13741 
c    b[21][4][2] = 13742 b[21][4][1] = 13743 b[21][4][0] = 13744 
c    b[21][5][2] = 13745 b[21][5][1] = 13746 b[21][5][0] = 13747 
c    b[21][6][2] = 13748 b[21][6][1] = 13749 b[21][6][0] = 13750 
c    b[21][7][2] = 13751 b[21][7][1] = 13752 b[21][7][0] = 13753 
c    b[21][8][2] = 13754 b[21][8][1] = 13755 b[21][8][0] = 13756 
c    b[21][9][2] = 13757 b[21][9][1] = 13758 b[21][9][0] = 13759 
c    b[21][10][2] = 13760 b[21][10][1] = 13761 b[21][10][0] = 13762 
c    b[21][11][2] = 13763 b[21][11][1] = 13764 b[21][11][0] = 13765 
c    b[21][12][2] = 13766 b[21][12][1] = 13767 b[21][12][0] = 13768 
c    b[21][13][2] = 13769 b[21][13][1] = 13770 b[21][13][0] = 13771 
c    b[21][14][2] = 13772 b[21][14][1] = 13773 b[21][14][0] = 13774 
c    b[21][15][2] = 13775 b[21][15][1] = 13776 b[21][15][0] = 13777 
c    b[21][16][2] = 13778 b[21][16][1] = 13779 b[21][16][0] = 13780 
c    b[21][17][2] = 13781 b[21][17][1] = 13782 b[21][17][0] = 13783 
c    b[21][18][2] = 13784 b[21][18][1] = 13785 b[21][18][0] = 13786 
c    b[21][19][2] = 13787 b[21][19][1] = 13788 b[21][19][0] = 13789 
c    b[21][20][2] = 13790 b[21][20][1] = 13791 b[21][20][0] = 13792 
c    b[21][21][2] = 13793 b[21][21][1] = 13794 b[21][21][0] = 13795 
c    b[21][22][2] = 13796 b[21][22][1] = 13797 b[21][22][0] = 13798 
c    b[21][23][2] = 13799 b[21][23][1] = 13800 b[21][23][0] = 13801 
c    b[21][24][2] = 13802 b[21][24][1] = 13803 b[21][24][0] = 13804 
c    b[21][25][2] = 13805 b[21][25][1] = 13806 b[21][25][0] = 13807 
c    b[21][26][2] = 13808 b[21][26][1] = 13809 b[21][26][0] = 13810 
c    b[21][27][2] = 13811 b[21][27][1] = 13812 b[21][27][0] = 13813 
c    b[21][28][2] = 13814 b[21][28][1] = 13815 b[21][28][0] = 13816 
c    b[21][29][2] = 13817 b[21][29][1] = 13818 b[21][29][0] = 13819 
c    b[21][30][2] = 13820 b[21][30][1] = 13821 b[21][30][0] = 13822 
c    b[21][31][2] = 13823 b[21][31][1] = 13824 b[21][31][0] = 13825 
c    b[21][32][2] = 13826 b[21][32][1] = 13827 b[21][32][0] = 13828 
c    b[21][33][2] = 13829 b[21][33][1] = 13830 b[21][33][0] = 13831 
c    b[21][34][2] = 13832 b[21][34][1] = 13833 b[21][34][0] = 13834 
c    b[21][35][2] = 13835 b[21][35][1] = 13836 b[21][35][0] = 13837 
c    b[21][36][2] = 13838 b[21][36][1] = 13839 b[21][36][0] = 13840 
c    b[21][37][2] = 13841 b[21][37][1] = 13842 b[21][37][0] = 13843 
c    b[21][38][2] = 13844 b[21][38][1] = 13845 b[21][38][0] = 13846 
c    b[21][39][2] = 13847 b[21][39][1] = 13848 b[21][39][0] = 13849 
c    b[21][40][2] = 13850 b[21][40][1] = 13851 b[21][40][0] = 13852 
c    b[21][41][2] = 13853 b[21][41][1] = 13854 b[21][41][0] = 13855 
c    b[21][42][2] = 13856 b[21][42][1] = 13857 b[21][42][0] = 13858 
c    b[21][43][2] = 13859 b[21][43][1] = 13860 b[21][43][0] = 13861 
c    b[21][44][2] = 13862 b[21][44][1] = 13863 b[21][44][0] = 13864 
c    b[21][45][2] = 13865 b[21][45][1] = 13866 b[21][45][0] = 13867 
c    b[21][46][2] = 13868 b[21][46][1] = 13869 b[21][46][0] = 13870 
c    b[21][47][2] = 13871 b[21][47][1] = 13872 b[21][47][0] = 13873 
c    b[21][48][2] = 13874 b[21][48][1] = 13875 b[21][48][0] = 13876 
c    b[21][49][2] = 13877 b[21][49][1] = 13878 b[21][49][0] = 13879 
c    b[21][50][2] = 13880 b[21][50][1] = 13881 b[21][50][0] = 13882 
c    b[21][51][2] = 13883 b[21][51][1] = 13884 b[21][51][0] = 13885 
c    b[21][52][2] = 13886 b[21][52][1] = 13887 b[21][52][0] = 13888 
c    b[21][53][2] = 13889 b[21][53][1] = 13890 b[21][53][0] = 13891 
c    b[21][54][2] = 13892 b[21][54][1] = 13893 b[21][54][0] = 13894 
c    b[21][55][2] = 13895 b[21][55][1] = 13896 b[21][55][0] = 13897 
c    b[21][56][2] = 13898 b[21][56][1] = 13899 b[21][56][0] = 13900 

c    b[22][1][2] = 13901 b[22][1][1] = 13902 b[22][1][0] = 13903 
c    b[22][2][2] = 13904 b[22][2][1] = 13905 b[22][2][0] = 13906 
c    b[22][3][2] = 13907 b[22][3][1] = 13908 b[22][3][0] = 13909 
c    b[22][4][2] = 13910 b[22][4][1] = 13911 b[22][4][0] = 13912 
c    b[22][5][2] = 13913 b[22][5][1] = 13914 b[22][5][0] = 13915 
c    b[22][6][2] = 13916 b[22][6][1] = 13917 b[22][6][0] = 13918 
c    b[22][7][2] = 13919 b[22][7][1] = 13920 b[22][7][0] = 13921 
c    b[22][8][2] = 13922 b[22][8][1] = 13923 b[22][8][0] = 13924 
c    b[22][9][2] = 13925 b[22][9][1] = 13926 b[22][9][0] = 13927 
c    b[22][10][2] = 13928 b[22][10][1] = 13929 b[22][10][0] = 13930 
c    b[22][11][2] = 13931 b[22][11][1] = 13932 b[22][11][0] = 13933 
c    b[22][12][2] = 13934 b[22][12][1] = 13935 b[22][12][0] = 13936 
c    b[22][13][2] = 13937 b[22][13][1] = 13938 b[22][13][0] = 13939 
c    b[22][14][2] = 13940 b[22][14][1] = 13941 b[22][14][0] = 13942 
c    b[22][15][2] = 13943 b[22][15][1] = 13944 b[22][15][0] = 13945 
c    b[22][16][2] = 13946 b[22][16][1] = 13947 b[22][16][0] = 13948 
c    b[22][17][2] = 13949 b[22][17][1] = 13950 b[22][17][0] = 13951 
c    b[22][18][2] = 13952 b[22][18][1] = 13953 b[22][18][0] = 13954 
c    b[22][19][2] = 13955 b[22][19][1] = 13956 b[22][19][0] = 13957 
c    b[22][20][2] = 13958 b[22][20][1] = 13959 b[22][20][0] = 13960 
c    b[22][21][2] = 13961 b[22][21][1] = 13962 b[22][21][0] = 13963 
c    b[22][22][2] = 13964 b[22][22][1] = 13965 b[22][22][0] = 13966 
c    b[22][23][2] = 13967 b[22][23][1] = 13968 b[22][23][0] = 13969 
c    b[22][24][2] = 13970 b[22][24][1] = 13971 b[22][24][0] = 13972 
c    b[22][25][2] = 13973 b[22][25][1] = 13974 b[22][25][0] = 13975 
c    b[22][26][2] = 13976 b[22][26][1] = 13977 b[22][26][0] = 13978 
c    b[22][27][2] = 13979 b[22][27][1] = 13980 b[22][27][0] = 13981 
c    b[22][28][2] = 13982 b[22][28][1] = 13983 b[22][28][0] = 13984 
c    b[22][29][2] = 13985 b[22][29][1] = 13986 b[22][29][0] = 13987 
c    b[22][30][2] = 13988 b[22][30][1] = 13989 b[22][30][0] = 13990 
c    b[22][31][2] = 13991 b[22][31][1] = 13992 b[22][31][0] = 13993 
c    b[22][32][2] = 13994 b[22][32][1] = 13995 b[22][32][0] = 13996 
c    b[22][33][2] = 13997 b[22][33][1] = 13998 b[22][33][0] = 13999 
c    b[22][34][2] = 14000 b[22][34][1] = 14001 b[22][34][0] = 14002 
c    b[22][35][2] = 14003 b[22][35][1] = 14004 b[22][35][0] = 14005 
c    b[22][36][2] = 14006 b[22][36][1] = 14007 b[22][36][0] = 14008 
c    b[22][37][2] = 14009 b[22][37][1] = 14010 b[22][37][0] = 14011 
c    b[22][38][2] = 14012 b[22][38][1] = 14013 b[22][38][0] = 14014 
c    b[22][39][2] = 14015 b[22][39][1] = 14016 b[22][39][0] = 14017 
c    b[22][40][2] = 14018 b[22][40][1] = 14019 b[22][40][0] = 14020 
c    b[22][41][2] = 14021 b[22][41][1] = 14022 b[22][41][0] = 14023 
c    b[22][42][2] = 14024 b[22][42][1] = 14025 b[22][42][0] = 14026 
c    b[22][43][2] = 14027 b[22][43][1] = 14028 b[22][43][0] = 14029 
c    b[22][44][2] = 14030 b[22][44][1] = 14031 b[22][44][0] = 14032 
c    b[22][45][2] = 14033 b[22][45][1] = 14034 b[22][45][0] = 14035 
c    b[22][46][2] = 14036 b[22][46][1] = 14037 b[22][46][0] = 14038 
c    b[22][47][2] = 14039 b[22][47][1] = 14040 b[22][47][0] = 14041 
c    b[22][48][2] = 14042 b[22][48][1] = 14043 b[22][48][0] = 14044 
c    b[22][49][2] = 14045 b[22][49][1] = 14046 b[22][49][0] = 14047 
c    b[22][50][2] = 14048 b[22][50][1] = 14049 b[22][50][0] = 14050 
c    b[22][51][2] = 14051 b[22][51][1] = 14052 b[22][51][0] = 14053 
c    b[22][52][2] = 14054 b[22][52][1] = 14055 b[22][52][0] = 14056 
c    b[22][53][2] = 14057 b[22][53][1] = 14058 b[22][53][0] = 14059 

c    b[23][1][2] = 14060 b[23][1][1] = 14061 b[23][1][0] = 14062 
c    b[23][2][2] = 14063 b[23][2][1] = 14064 b[23][2][0] = 14065 
c    b[23][3][2] = 14066 b[23][3][1] = 14067 b[23][3][0] = 14068 
c    b[23][4][2] = 14069 b[23][4][1] = 14070 b[23][4][0] = 14071 
c    b[23][5][2] = 14072 b[23][5][1] = 14073 b[23][5][0] = 14074 
c    b[23][6][2] = 14075 b[23][6][1] = 14076 b[23][6][0] = 14077 
c    b[23][7][2] = 14078 b[23][7][1] = 14079 b[23][7][0] = 14080 
c    b[23][8][2] = 14081 b[23][8][1] = 14082 b[23][8][0] = 14083 
c    b[23][9][2] = 14084 b[23][9][1] = 14085 b[23][9][0] = 14086 
c    b[23][10][2] = 14087 b[23][10][1] = 14088 b[23][10][0] = 14089 
c    b[23][11][2] = 14090 b[23][11][1] = 14091 b[23][11][0] = 14092 
c    b[23][12][2] = 14093 b[23][12][1] = 14094 b[23][12][0] = 14095 
c    b[23][13][2] = 14096 b[23][13][1] = 14097 b[23][13][0] = 14098 
c    b[23][14][2] = 14099 b[23][14][1] = 14100 b[23][14][0] = 14101 
c    b[23][15][2] = 14102 b[23][15][1] = 14103 b[23][15][0] = 14104 
c    b[23][16][2] = 14105 b[23][16][1] = 14106 b[23][16][0] = 14107 
c    b[23][17][2] = 14108 b[23][17][1] = 14109 b[23][17][0] = 14110 
c    b[23][18][2] = 14111 b[23][18][1] = 14112 b[23][18][0] = 14113 
c    b[23][19][2] = 14114 b[23][19][1] = 14115 b[23][19][0] = 14116 
c    b[23][20][2] = 14117 b[23][20][1] = 14118 b[23][20][0] = 14119 
c    b[23][21][2] = 14120 b[23][21][1] = 14121 b[23][21][0] = 14122 
c    b[23][22][2] = 14123 b[23][22][1] = 14124 b[23][22][0] = 14125 
c    b[23][23][2] = 14126 b[23][23][1] = 14127 b[23][23][0] = 14128 
c    b[23][24][2] = 14129 b[23][24][1] = 14130 b[23][24][0] = 14131 
c    b[23][25][2] = 14132 b[23][25][1] = 14133 b[23][25][0] = 14134 
c    b[23][26][2] = 14135 b[23][26][1] = 14136 b[23][26][0] = 14137 
c    b[23][27][2] = 14138 b[23][27][1] = 14139 b[23][27][0] = 14140 
c    b[23][28][2] = 14141 b[23][28][1] = 14142 b[23][28][0] = 14143 
c    b[23][29][2] = 14144 b[23][29][1] = 14145 b[23][29][0] = 14146 
c    b[23][30][2] = 14147 b[23][30][1] = 14148 b[23][30][0] = 14149 
c    b[23][31][2] = 14150 b[23][31][1] = 14151 b[23][31][0] = 14152 
c    b[23][32][2] = 14153 b[23][32][1] = 14154 b[23][32][0] = 14155 
c    b[23][33][2] = 14156 b[23][33][1] = 14157 b[23][33][0] = 14158 
c    b[23][34][2] = 14159 b[23][34][1] = 14160 b[23][34][0] = 14161 
c    b[23][35][2] = 14162 b[23][35][1] = 14163 b[23][35][0] = 14164 
c    b[23][36][2] = 14165 b[23][36][1] = 14166 b[23][36][0] = 14167 
c    b[23][37][2] = 14168 b[23][37][1] = 14169 b[23][37][0] = 14170 
c    b[23][38][2] = 14171 b[23][38][1] = 14172 b[23][38][0] = 14173 
c    b[23][39][2] = 14174 b[23][39][1] = 14175 b[23][39][0] = 14176 
c    b[23][40][2] = 14177 b[23][40][1] = 14178 b[23][40][0] = 14179 
c    b[23][41][2] = 14180 b[23][41][1] = 14181 b[23][41][0] = 14182 
c    b[23][42][2] = 14183 b[23][42][1] = 14184 b[23][42][0] = 14185 
c    b[23][43][2] = 14186 b[23][43][1] = 14187 b[23][43][0] = 14188 
c    b[23][44][2] = 14189 b[23][44][1] = 14190 b[23][44][0] = 14191 
c    b[23][45][2] = 14192 b[23][45][1] = 14193 b[23][45][0] = 14194 
c    b[23][46][2] = 14195 b[23][46][1] = 14196 b[23][46][0] = 14197 
c    b[23][47][2] = 14198 b[23][47][1] = 14199 b[23][47][0] = 14200 
c    b[23][48][2] = 14201 b[23][48][1] = 14202 b[23][48][0] = 14203 
c    b[23][49][2] = 14204 b[23][49][1] = 14205 b[23][49][0] = 14206 
c    b[23][50][2] = 14207 b[23][50][1] = 14208 b[23][50][0] = 14209 
c    b[23][51][2] = 14210 b[23][51][1] = 14211 b[23][51][0] = 14212 

c    b[24][1][2] = 14213 b[24][1][1] = 14214 b[24][1][0] = 14215 
c    b[24][2][2] = 14216 b[24][2][1] = 14217 b[24][2][0] = 14218 
c    b[24][3][2] = 14219 b[24][3][1] = 14220 b[24][3][0] = 14221 
c    b[24][4][2] = 14222 b[24][4][1] = 14223 b[24][4][0] = 14224 
c    b[24][5][2] = 14225 b[24][5][1] = 14226 b[24][5][0] = 14227 
c    b[24][6][2] = 14228 b[24][6][1] = 14229 b[24][6][0] = 14230 
c    b[24][7][2] = 14231 b[24][7][1] = 14232 b[24][7][0] = 14233 
c    b[24][8][2] = 14234 b[24][8][1] = 14235 b[24][8][0] = 14236 
c    b[24][9][2] = 14237 b[24][9][1] = 14238 b[24][9][0] = 14239 
c    b[24][10][2] = 14240 b[24][10][1] = 14241 b[24][10][0] = 14242 
c    b[24][11][2] = 14243 b[24][11][1] = 14244 b[24][11][0] = 14245 
c    b[24][12][2] = 14246 b[24][12][1] = 14247 b[24][12][0] = 14248 
c    b[24][13][2] = 14249 b[24][13][1] = 14250 b[24][13][0] = 14251 
c    b[24][14][2] = 14252 b[24][14][1] = 14253 b[24][14][0] = 14254 
c    b[24][15][2] = 14255 b[24][15][1] = 14256 b[24][15][0] = 14257 
c    b[24][16][2] = 14258 b[24][16][1] = 14259 b[24][16][0] = 14260 
c    b[24][17][2] = 14261 b[24][17][1] = 14262 b[24][17][0] = 14263 
c    b[24][18][2] = 14264 b[24][18][1] = 14265 b[24][18][0] = 14266 
c    b[24][19][2] = 14267 b[24][19][1] = 14268 b[24][19][0] = 14269 
c    b[24][20][2] = 14270 b[24][20][1] = 14271 b[24][20][0] = 14272 
c    b[24][21][2] = 14273 b[24][21][1] = 14274 b[24][21][0] = 14275 
c    b[24][22][2] = 14276 b[24][22][1] = 14277 b[24][22][0] = 14278 
c    b[24][23][2] = 14279 b[24][23][1] = 14280 b[24][23][0] = 14281 
c    b[24][24][2] = 14282 b[24][24][1] = 14283 b[24][24][0] = 14284 
c    b[24][25][2] = 14285 b[24][25][1] = 14286 b[24][25][0] = 14287 
c    b[24][26][2] = 14288 b[24][26][1] = 14289 b[24][26][0] = 14290 
c    b[24][27][2] = 14291 b[24][27][1] = 14292 b[24][27][0] = 14293 
c    b[24][28][2] = 14294 b[24][28][1] = 14295 b[24][28][0] = 14296 
c    b[24][29][2] = 14297 b[24][29][1] = 14298 b[24][29][0] = 14299 
c    b[24][30][2] = 14300 b[24][30][1] = 14301 b[24][30][0] = 14302 
c    b[24][31][2] = 14303 b[24][31][1] = 14304 b[24][31][0] = 14305 
c    b[24][32][2] = 14306 b[24][32][1] = 14307 b[24][32][0] = 14308 
c    b[24][33][2] = 14309 b[24][33][1] = 14310 b[24][33][0] = 14311 
c    b[24][34][2] = 14312 b[24][34][1] = 14313 b[24][34][0] = 14314 
c    b[24][35][2] = 14315 b[24][35][1] = 14316 b[24][35][0] = 14317 
c    b[24][36][2] = 14318 b[24][36][1] = 14319 b[24][36][0] = 14320 
c    b[24][37][2] = 14321 b[24][37][1] = 14322 b[24][37][0] = 14323 
c    b[24][38][2] = 14324 b[24][38][1] = 14325 b[24][38][0] = 14326 
c    b[24][39][2] = 14327 b[24][39][1] = 14328 b[24][39][0] = 14329 
c    b[24][40][2] = 14330 b[24][40][1] = 14331 b[24][40][0] = 14332 
c    b[24][41][2] = 14333 b[24][41][1] = 14334 b[24][41][0] = 14335 
c    b[24][42][2] = 14336 b[24][42][1] = 14337 b[24][42][0] = 14338 
c    b[24][43][2] = 14339 b[24][43][1] = 14340 b[24][43][0] = 14341 
c    b[24][44][2] = 14342 b[24][44][1] = 14343 b[24][44][0] = 14344 
c    b[24][45][2] = 14345 b[24][45][1] = 14346 b[24][45][0] = 14347 
c    b[24][46][2] = 14348 b[24][46][1] = 14349 b[24][46][0] = 14350 
c    b[24][47][2] = 14351 b[24][47][1] = 14352 b[24][47][0] = 14353 
c    b[24][48][2] = 14354 b[24][48][1] = 14355 b[24][48][0] = 14356 
c    b[24][49][2] = 14357 b[24][49][1] = 14358 b[24][49][0] = 14359 

c    b[25][1][2] = 14360 b[25][1][1] = 14361 b[25][1][0] = 14362 
c    b[25][2][2] = 14363 b[25][2][1] = 14364 b[25][2][0] = 14365 
c    b[25][3][2] = 14366 b[25][3][1] = 14367 b[25][3][0] = 14368 
c    b[25][4][2] = 14369 b[25][4][1] = 14370 b[25][4][0] = 14371 
c    b[25][5][2] = 14372 b[25][5][1] = 14373 b[25][5][0] = 14374 
c    b[25][6][2] = 14375 b[25][6][1] = 14376 b[25][6][0] = 14377 
c    b[25][7][2] = 14378 b[25][7][1] = 14379 b[25][7][0] = 14380 
c    b[25][8][2] = 14381 b[25][8][1] = 14382 b[25][8][0] = 14383 
c    b[25][9][2] = 14384 b[25][9][1] = 14385 b[25][9][0] = 14386 
c    b[25][10][2] = 14387 b[25][10][1] = 14388 b[25][10][0] = 14389 
c    b[25][11][2] = 14390 b[25][11][1] = 14391 b[25][11][0] = 14392 
c    b[25][12][2] = 14393 b[25][12][1] = 14394 b[25][12][0] = 14395 
c    b[25][13][2] = 14396 b[25][13][1] = 14397 b[25][13][0] = 14398 
c    b[25][14][2] = 14399 b[25][14][1] = 14400 b[25][14][0] = 14401 
c    b[25][15][2] = 14402 b[25][15][1] = 14403 b[25][15][0] = 14404 
c    b[25][16][2] = 14405 b[25][16][1] = 14406 b[25][16][0] = 14407 
c    b[25][17][2] = 14408 b[25][17][1] = 14409 b[25][17][0] = 14410 
c    b[25][18][2] = 14411 b[25][18][1] = 14412 b[25][18][0] = 14413 
c    b[25][19][2] = 14414 b[25][19][1] = 14415 b[25][19][0] = 14416 
c    b[25][20][2] = 14417 b[25][20][1] = 14418 b[25][20][0] = 14419 
c    b[25][21][2] = 14420 b[25][21][1] = 14421 b[25][21][0] = 14422 
c    b[25][22][2] = 14423 b[25][22][1] = 14424 b[25][22][0] = 14425 
c    b[25][23][2] = 14426 b[25][23][1] = 14427 b[25][23][0] = 14428 
c    b[25][24][2] = 14429 b[25][24][1] = 14430 b[25][24][0] = 14431 
c    b[25][25][2] = 14432 b[25][25][1] = 14433 b[25][25][0] = 14434 
c    b[25][26][2] = 14435 b[25][26][1] = 14436 b[25][26][0] = 14437 
c    b[25][27][2] = 14438 b[25][27][1] = 14439 b[25][27][0] = 14440 
c    b[25][28][2] = 14441 b[25][28][1] = 14442 b[25][28][0] = 14443 
c    b[25][29][2] = 14444 b[25][29][1] = 14445 b[25][29][0] = 14446 
c    b[25][30][2] = 14447 b[25][30][1] = 14448 b[25][30][0] = 14449 
c    b[25][31][2] = 14450 b[25][31][1] = 14451 b[25][31][0] = 14452 
c    b[25][32][2] = 14453 b[25][32][1] = 14454 b[25][32][0] = 14455 
c    b[25][33][2] = 14456 b[25][33][1] = 14457 b[25][33][0] = 14458 
c    b[25][34][2] = 14459 b[25][34][1] = 14460 b[25][34][0] = 14461 
c    b[25][35][2] = 14462 b[25][35][1] = 14463 b[25][35][0] = 14464 
c    b[25][36][2] = 14465 b[25][36][1] = 14466 b[25][36][0] = 14467 
c    b[25][37][2] = 14468 b[25][37][1] = 14469 b[25][37][0] = 14470 
c    b[25][38][2] = 14471 b[25][38][1] = 14472 b[25][38][0] = 14473 
c    b[25][39][2] = 14474 b[25][39][1] = 14475 b[25][39][0] = 14476 
c    b[25][40][2] = 14477 b[25][40][1] = 14478 b[25][40][0] = 14479 
c    b[25][41][2] = 14480 b[25][41][1] = 14481 b[25][41][0] = 14482 
c    b[25][42][2] = 14483 b[25][42][1] = 14484 b[25][42][0] = 14485 
c    b[25][43][2] = 14486 b[25][43][1] = 14487 b[25][43][0] = 14488 
c    b[25][44][2] = 14489 b[25][44][1] = 14490 b[25][44][0] = 14491 
c    b[25][45][2] = 14492 b[25][45][1] = 14493 b[25][45][0] = 14494 
c    b[25][46][2] = 14495 b[25][46][1] = 14496 b[25][46][0] = 14497 
c    b[25][47][2] = 14498 b[25][47][1] = 14499 b[25][47][0] = 14500 

c    b[26][1][2] = 14501 b[26][1][1] = 14502 b[26][1][0] = 14503 
c    b[26][2][2] = 14504 b[26][2][1] = 14505 b[26][2][0] = 14506 
c    b[26][3][2] = 14507 b[26][3][1] = 14508 b[26][3][0] = 14509 
c    b[26][4][2] = 14510 b[26][4][1] = 14511 b[26][4][0] = 14512 
c    b[26][5][2] = 14513 b[26][5][1] = 14514 b[26][5][0] = 14515 
c    b[26][6][2] = 14516 b[26][6][1] = 14517 b[26][6][0] = 14518 
c    b[26][7][2] = 14519 b[26][7][1] = 14520 b[26][7][0] = 14521 
c    b[26][8][2] = 14522 b[26][8][1] = 14523 b[26][8][0] = 14524 
c    b[26][9][2] = 14525 b[26][9][1] = 14526 b[26][9][0] = 14527 
c    b[26][10][2] = 14528 b[26][10][1] = 14529 b[26][10][0] = 14530 
c    b[26][11][2] = 14531 b[26][11][1] = 14532 b[26][11][0] = 14533 
c    b[26][12][2] = 14534 b[26][12][1] = 14535 b[26][12][0] = 14536 
c    b[26][13][2] = 14537 b[26][13][1] = 14538 b[26][13][0] = 14539 
c    b[26][14][2] = 14540 b[26][14][1] = 14541 b[26][14][0] = 14542 
c    b[26][15][2] = 14543 b[26][15][1] = 14544 b[26][15][0] = 14545 
c    b[26][16][2] = 14546 b[26][16][1] = 14547 b[26][16][0] = 14548 
c    b[26][17][2] = 14549 b[26][17][1] = 14550 b[26][17][0] = 14551 
c    b[26][18][2] = 14552 b[26][18][1] = 14553 b[26][18][0] = 14554 
c    b[26][19][2] = 14555 b[26][19][1] = 14556 b[26][19][0] = 14557 
c    b[26][20][2] = 14558 b[26][20][1] = 14559 b[26][20][0] = 14560 
c    b[26][21][2] = 14561 b[26][21][1] = 14562 b[26][21][0] = 14563 
c    b[26][22][2] = 14564 b[26][22][1] = 14565 b[26][22][0] = 14566 
c    b[26][23][2] = 14567 b[26][23][1] = 14568 b[26][23][0] = 14569 
c    b[26][24][2] = 14570 b[26][24][1] = 14571 b[26][24][0] = 14572 
c    b[26][25][2] = 14573 b[26][25][1] = 14574 b[26][25][0] = 14575 
c    b[26][26][2] = 14576 b[26][26][1] = 14577 b[26][26][0] = 14578 
c    b[26][27][2] = 14579 b[26][27][1] = 14580 b[26][27][0] = 14581 
c    b[26][28][2] = 14582 b[26][28][1] = 14583 b[26][28][0] = 14584 
c    b[26][29][2] = 14585 b[26][29][1] = 14586 b[26][29][0] = 14587 
c    b[26][30][2] = 14588 b[26][30][1] = 14589 b[26][30][0] = 14590 
c    b[26][31][2] = 14591 b[26][31][1] = 14592 b[26][31][0] = 14593 
c    b[26][32][2] = 14594 b[26][32][1] = 14595 b[26][32][0] = 14596 
c    b[26][33][2] = 14597 b[26][33][1] = 14598 b[26][33][0] = 14599 
c    b[26][34][2] = 14600 b[26][34][1] = 14601 b[26][34][0] = 14602 
c    b[26][35][2] = 14603 b[26][35][1] = 14604 b[26][35][0] = 14605 
c    b[26][36][2] = 14606 b[26][36][1] = 14607 b[26][36][0] = 14608 
c    b[26][37][2] = 14609 b[26][37][1] = 14610 b[26][37][0] = 14611 
c    b[26][38][2] = 14612 b[26][38][1] = 14613 b[26][38][0] = 14614 
c    b[26][39][2] = 14615 b[26][39][1] = 14616 b[26][39][0] = 14617 
c    b[26][40][2] = 14618 b[26][40][1] = 14619 b[26][40][0] = 14620 
c    b[26][41][2] = 14621 b[26][41][1] = 14622 b[26][41][0] = 14623 
c    b[26][42][2] = 14624 b[26][42][1] = 14625 b[26][42][0] = 14626 
c    b[26][43][2] = 14627 b[26][43][1] = 14628 b[26][43][0] = 14629 
c    b[26][44][2] = 14630 b[26][44][1] = 14631 b[26][44][0] = 14632 
c    b[26][45][2] = 14633 b[26][45][1] = 14634 b[26][45][0] = 14635 

c    b[27][1][2] = 14636 b[27][1][1] = 14637 b[27][1][0] = 14638 
c    b[27][2][2] = 14639 b[27][2][1] = 14640 b[27][2][0] = 14641 
c    b[27][3][2] = 14642 b[27][3][1] = 14643 b[27][3][0] = 14644 
c    b[27][4][2] = 14645 b[27][4][1] = 14646 b[27][4][0] = 14647 
c    b[27][5][2] = 14648 b[27][5][1] = 14649 b[27][5][0] = 14650 
c    b[27][6][2] = 14651 b[27][6][1] = 14652 b[27][6][0] = 14653 
c    b[27][7][2] = 14654 b[27][7][1] = 14655 b[27][7][0] = 14656 
c    b[27][8][2] = 14657 b[27][8][1] = 14658 b[27][8][0] = 14659 
c    b[27][9][2] = 14660 b[27][9][1] = 14661 b[27][9][0] = 14662 
c    b[27][10][2] = 14663 b[27][10][1] = 14664 b[27][10][0] = 14665 
c    b[27][11][2] = 14666 b[27][11][1] = 14667 b[27][11][0] = 14668 
c    b[27][12][2] = 14669 b[27][12][1] = 14670 b[27][12][0] = 14671 
c    b[27][13][2] = 14672 b[27][13][1] = 14673 b[27][13][0] = 14674 
c    b[27][14][2] = 14675 b[27][14][1] = 14676 b[27][14][0] = 14677 
c    b[27][15][2] = 14678 b[27][15][1] = 14679 b[27][15][0] = 14680 
c    b[27][16][2] = 14681 b[27][16][1] = 14682 b[27][16][0] = 14683 
c    b[27][17][2] = 14684 b[27][17][1] = 14685 b[27][17][0] = 14686 
c    b[27][18][2] = 14687 b[27][18][1] = 14688 b[27][18][0] = 14689 
c    b[27][19][2] = 14690 b[27][19][1] = 14691 b[27][19][0] = 14692 
c    b[27][20][2] = 14693 b[27][20][1] = 14694 b[27][20][0] = 14695 
c    b[27][21][2] = 14696 b[27][21][1] = 14697 b[27][21][0] = 14698 
c    b[27][22][2] = 14699 b[27][22][1] = 14700 b[27][22][0] = 14701 
c    b[27][23][2] = 14702 b[27][23][1] = 14703 b[27][23][0] = 14704 
c    b[27][24][2] = 14705 b[27][24][1] = 14706 b[27][24][0] = 14707 
c    b[27][25][2] = 14708 b[27][25][1] = 14709 b[27][25][0] = 14710 
c    b[27][26][2] = 14711 b[27][26][1] = 14712 b[27][26][0] = 14713 
c    b[27][27][2] = 14714 b[27][27][1] = 14715 b[27][27][0] = 14716 
c    b[27][28][2] = 14717 b[27][28][1] = 14718 b[27][28][0] = 14719 
c    b[27][29][2] = 14720 b[27][29][1] = 14721 b[27][29][0] = 14722 
c    b[27][30][2] = 14723 b[27][30][1] = 14724 b[27][30][0] = 14725 
c    b[27][31][2] = 14726 b[27][31][1] = 14727 b[27][31][0] = 14728 
c    b[27][32][2] = 14729 b[27][32][1] = 14730 b[27][32][0] = 14731 
c    b[27][33][2] = 14732 b[27][33][1] = 14733 b[27][33][0] = 14734 
c    b[27][34][2] = 14735 b[27][34][1] = 14736 b[27][34][0] = 14737 
c    b[27][35][2] = 14738 b[27][35][1] = 14739 b[27][35][0] = 14740 
c    b[27][36][2] = 14741 b[27][36][1] = 14742 b[27][36][0] = 14743 
c    b[27][37][2] = 14744 b[27][37][1] = 14745 b[27][37][0] = 14746 
c    b[27][38][2] = 14747 b[27][38][1] = 14748 b[27][38][0] = 14749 
c    b[27][39][2] = 14750 b[27][39][1] = 14751 b[27][39][0] = 14752 
c    b[27][40][2] = 14753 b[27][40][1] = 14754 b[27][40][0] = 14755 
c    b[27][41][2] = 14756 b[27][41][1] = 14757 b[27][41][0] = 14758 
c    b[27][42][2] = 14759 b[27][42][1] = 14760 b[27][42][0] = 14761 
c    b[27][43][2] = 14762 b[27][43][1] = 14763 b[27][43][0] = 14764 
c    b[27][44][2] = 14765 b[27][44][1] = 14766 b[27][44][0] = 14767 

c    b[28][1][2] = 14768 b[28][1][1] = 14769 b[28][1][0] = 14770 
c    b[28][2][2] = 14771 b[28][2][1] = 14772 b[28][2][0] = 14773 
c    b[28][3][2] = 14774 b[28][3][1] = 14775 b[28][3][0] = 14776 
c    b[28][4][2] = 14777 b[28][4][1] = 14778 b[28][4][0] = 14779 
c    b[28][5][2] = 14780 b[28][5][1] = 14781 b[28][5][0] = 14782 
c    b[28][6][2] = 14783 b[28][6][1] = 14784 b[28][6][0] = 14785 
c    b[28][7][2] = 14786 b[28][7][1] = 14787 b[28][7][0] = 14788 
c    b[28][8][2] = 14789 b[28][8][1] = 14790 b[28][8][0] = 14791 
c    b[28][9][2] = 14792 b[28][9][1] = 14793 b[28][9][0] = 14794 
c    b[28][10][2] = 14795 b[28][10][1] = 14796 b[28][10][0] = 14797 
c    b[28][11][2] = 14798 b[28][11][1] = 14799 b[28][11][0] = 14800 
c    b[28][12][2] = 14801 b[28][12][1] = 14802 b[28][12][0] = 14803 
c    b[28][13][2] = 14804 b[28][13][1] = 14805 b[28][13][0] = 14806 
c    b[28][14][2] = 14807 b[28][14][1] = 14808 b[28][14][0] = 14809 
c    b[28][15][2] = 14810 b[28][15][1] = 14811 b[28][15][0] = 14812 
c    b[28][16][2] = 14813 b[28][16][1] = 14814 b[28][16][0] = 14815 
c    b[28][17][2] = 14816 b[28][17][1] = 14817 b[28][17][0] = 14818 
c    b[28][18][2] = 14819 b[28][18][1] = 14820 b[28][18][0] = 14821 
c    b[28][19][2] = 14822 b[28][19][1] = 14823 b[28][19][0] = 14824 
c    b[28][20][2] = 14825 b[28][20][1] = 14826 b[28][20][0] = 14827 
c    b[28][21][2] = 14828 b[28][21][1] = 14829 b[28][21][0] = 14830 
c    b[28][22][2] = 14831 b[28][22][1] = 14832 b[28][22][0] = 14833 
c    b[28][23][2] = 14834 b[28][23][1] = 14835 b[28][23][0] = 14836 
c    b[28][24][2] = 14837 b[28][24][1] = 14838 b[28][24][0] = 14839 
c    b[28][25][2] = 14840 b[28][25][1] = 14841 b[28][25][0] = 14842 
c    b[28][26][2] = 14843 b[28][26][1] = 14844 b[28][26][0] = 14845 
c    b[28][27][2] = 14846 b[28][27][1] = 14847 b[28][27][0] = 14848 
c    b[28][28][2] = 14849 b[28][28][1] = 14850 b[28][28][0] = 14851 
c    b[28][29][2] = 14852 b[28][29][1] = 14853 b[28][29][0] = 14854 
c    b[28][30][2] = 14855 b[28][30][1] = 14856 b[28][30][0] = 14857 
c    b[28][31][2] = 14858 b[28][31][1] = 14859 b[28][31][0] = 14860 
c    b[28][32][2] = 14861 b[28][32][1] = 14862 b[28][32][0] = 14863 
c    b[28][33][2] = 14864 b[28][33][1] = 14865 b[28][33][0] = 14866 
c    b[28][34][2] = 14867 b[28][34][1] = 14868 b[28][34][0] = 14869 
c    b[28][35][2] = 14870 b[28][35][1] = 14871 b[28][35][0] = 14872 
c    b[28][36][2] = 14873 b[28][36][1] = 14874 b[28][36][0] = 14875 
c    b[28][37][2] = 14876 b[28][37][1] = 14877 b[28][37][0] = 14878 
c    b[28][38][2] = 14879 b[28][38][1] = 14880 b[28][38][0] = 14881 
c    b[28][39][2] = 14882 b[28][39][1] = 14883 b[28][39][0] = 14884 
c    b[28][40][2] = 14885 b[28][40][1] = 14886 b[28][40][0] = 14887 
c    b[28][41][2] = 14888 b[28][41][1] = 14889 b[28][41][0] = 14890 
c    b[28][42][2] = 14891 b[28][42][1] = 14892 b[28][42][0] = 14893 

c    b[29][1][2] = 14894 b[29][1][1] = 14895 b[29][1][0] = 14896 
c    b[29][2][2] = 14897 b[29][2][1] = 14898 b[29][2][0] = 14899 
c    b[29][3][2] = 14900 b[29][3][1] = 14901 b[29][3][0] = 14902 
c    b[29][4][2] = 14903 b[29][4][1] = 14904 b[29][4][0] = 14905 
c    b[29][5][2] = 14906 b[29][5][1] = 14907 b[29][5][0] = 14908 
c    b[29][6][2] = 14909 b[29][6][1] = 14910 b[29][6][0] = 14911 
c    b[29][7][2] = 14912 b[29][7][1] = 14913 b[29][7][0] = 14914 
c    b[29][8][2] = 14915 b[29][8][1] = 14916 b[29][8][0] = 14917 
c    b[29][9][2] = 14918 b[29][9][1] = 14919 b[29][9][0] = 14920 
c    b[29][10][2] = 14921 b[29][10][1] = 14922 b[29][10][0] = 14923 
c    b[29][11][2] = 14924 b[29][11][1] = 14925 b[29][11][0] = 14926 
c    b[29][12][2] = 14927 b[29][12][1] = 14928 b[29][12][0] = 14929 
c    b[29][13][2] = 14930 b[29][13][1] = 14931 b[29][13][0] = 14932 
c    b[29][14][2] = 14933 b[29][14][1] = 14934 b[29][14][0] = 14935 
c    b[29][15][2] = 14936 b[29][15][1] = 14937 b[29][15][0] = 14938 
c    b[29][16][2] = 14939 b[29][16][1] = 14940 b[29][16][0] = 14941 
c    b[29][17][2] = 14942 b[29][17][1] = 14943 b[29][17][0] = 14944 
c    b[29][18][2] = 14945 b[29][18][1] = 14946 b[29][18][0] = 14947 
c    b[29][19][2] = 14948 b[29][19][1] = 14949 b[29][19][0] = 14950 
c    b[29][20][2] = 14951 b[29][20][1] = 14952 b[29][20][0] = 14953 
c    b[29][21][2] = 14954 b[29][21][1] = 14955 b[29][21][0] = 14956 
c    b[29][22][2] = 14957 b[29][22][1] = 14958 b[29][22][0] = 14959 
c    b[29][23][2] = 14960 b[29][23][1] = 14961 b[29][23][0] = 14962 
c    b[29][24][2] = 14963 b[29][24][1] = 14964 b[29][24][0] = 14965 
c    b[29][25][2] = 14966 b[29][25][1] = 14967 b[29][25][0] = 14968 
c    b[29][26][2] = 14969 b[29][26][1] = 14970 b[29][26][0] = 14971 
c    b[29][27][2] = 14972 b[29][27][1] = 14973 b[29][27][0] = 14974 
c    b[29][28][2] = 14975 b[29][28][1] = 14976 b[29][28][0] = 14977 
c    b[29][29][2] = 14978 b[29][29][1] = 14979 b[29][29][0] = 14980 
c    b[29][30][2] = 14981 b[29][30][1] = 14982 b[29][30][0] = 14983 
c    b[29][31][2] = 14984 b[29][31][1] = 14985 b[29][31][0] = 14986 
c    b[29][32][2] = 14987 b[29][32][1] = 14988 b[29][32][0] = 14989 
c    b[29][33][2] = 14990 b[29][33][1] = 14991 b[29][33][0] = 14992 
c    b[29][34][2] = 14993 b[29][34][1] = 14994 b[29][34][0] = 14995 
c    b[29][35][2] = 14996 b[29][35][1] = 14997 b[29][35][0] = 14998 
c    b[29][36][2] = 14999 b[29][36][1] = 15000 b[29][36][0] = 15001 
c    b[29][37][2] = 15002 b[29][37][1] = 15003 b[29][37][0] = 15004 
c    b[29][38][2] = 15005 b[29][38][1] = 15006 b[29][38][0] = 15007 
c    b[29][39][2] = 15008 b[29][39][1] = 15009 b[29][39][0] = 15010 
c    b[29][40][2] = 15011 b[29][40][1] = 15012 b[29][40][0] = 15013 
c    b[29][41][2] = 15014 b[29][41][1] = 15015 b[29][41][0] = 15016 

c    b[30][1][2] = 15017 b[30][1][1] = 15018 b[30][1][0] = 15019 
c    b[30][2][2] = 15020 b[30][2][1] = 15021 b[30][2][0] = 15022 
c    b[30][3][2] = 15023 b[30][3][1] = 15024 b[30][3][0] = 15025 
c    b[30][4][2] = 15026 b[30][4][1] = 15027 b[30][4][0] = 15028 
c    b[30][5][2] = 15029 b[30][5][1] = 15030 b[30][5][0] = 15031 
c    b[30][6][2] = 15032 b[30][6][1] = 15033 b[30][6][0] = 15034 
c    b[30][7][2] = 15035 b[30][7][1] = 15036 b[30][7][0] = 15037 
c    b[30][8][2] = 15038 b[30][8][1] = 15039 b[30][8][0] = 15040 
c    b[30][9][2] = 15041 b[30][9][1] = 15042 b[30][9][0] = 15043 
c    b[30][10][2] = 15044 b[30][10][1] = 15045 b[30][10][0] = 15046 
c    b[30][11][2] = 15047 b[30][11][1] = 15048 b[30][11][0] = 15049 
c    b[30][12][2] = 15050 b[30][12][1] = 15051 b[30][12][0] = 15052 
c    b[30][13][2] = 15053 b[30][13][1] = 15054 b[30][13][0] = 15055 
c    b[30][14][2] = 15056 b[30][14][1] = 15057 b[30][14][0] = 15058 
c    b[30][15][2] = 15059 b[30][15][1] = 15060 b[30][15][0] = 15061 
c    b[30][16][2] = 15062 b[30][16][1] = 15063 b[30][16][0] = 15064 
c    b[30][17][2] = 15065 b[30][17][1] = 15066 b[30][17][0] = 15067 
c    b[30][18][2] = 15068 b[30][18][1] = 15069 b[30][18][0] = 15070 
c    b[30][19][2] = 15071 b[30][19][1] = 15072 b[30][19][0] = 15073 
c    b[30][20][2] = 15074 b[30][20][1] = 15075 b[30][20][0] = 15076 
c    b[30][21][2] = 15077 b[30][21][1] = 15078 b[30][21][0] = 15079 
c    b[30][22][2] = 15080 b[30][22][1] = 15081 b[30][22][0] = 15082 
c    b[30][23][2] = 15083 b[30][23][1] = 15084 b[30][23][0] = 15085 
c    b[30][24][2] = 15086 b[30][24][1] = 15087 b[30][24][0] = 15088 
c    b[30][25][2] = 15089 b[30][25][1] = 15090 b[30][25][0] = 15091 
c    b[30][26][2] = 15092 b[30][26][1] = 15093 b[30][26][0] = 15094 
c    b[30][27][2] = 15095 b[30][27][1] = 15096 b[30][27][0] = 15097 
c    b[30][28][2] = 15098 b[30][28][1] = 15099 b[30][28][0] = 15100 
c    b[30][29][2] = 15101 b[30][29][1] = 15102 b[30][29][0] = 15103 
c    b[30][30][2] = 15104 b[30][30][1] = 15105 b[30][30][0] = 15106 
c    b[30][31][2] = 15107 b[30][31][1] = 15108 b[30][31][0] = 15109 
c    b[30][32][2] = 15110 b[30][32][1] = 15111 b[30][32][0] = 15112 
c    b[30][33][2] = 15113 b[30][33][1] = 15114 b[30][33][0] = 15115 
c    b[30][34][2] = 15116 b[30][34][1] = 15117 b[30][34][0] = 15118 
c    b[30][35][2] = 15119 b[30][35][1] = 15120 b[30][35][0] = 15121 
c    b[30][36][2] = 15122 b[30][36][1] = 15123 b[30][36][0] = 15124 
c    b[30][37][2] = 15125 b[30][37][1] = 15126 b[30][37][0] = 15127 
c    b[30][38][2] = 15128 b[30][38][1] = 15129 b[30][38][0] = 15130 
c    b[30][39][2] = 15131 b[30][39][1] = 15132 b[30][39][0] = 15133 

c    b[31][1][2] = 15134 b[31][1][1] = 15135 b[31][1][0] = 15136 
c    b[31][2][2] = 15137 b[31][2][1] = 15138 b[31][2][0] = 15139 
c    b[31][3][2] = 15140 b[31][3][1] = 15141 b[31][3][0] = 15142 
c    b[31][4][2] = 15143 b[31][4][1] = 15144 b[31][4][0] = 15145 
c    b[31][5][2] = 15146 b[31][5][1] = 15147 b[31][5][0] = 15148 
c    b[31][6][2] = 15149 b[31][6][1] = 15150 b[31][6][0] = 15151 
c    b[31][7][2] = 15152 b[31][7][1] = 15153 b[31][7][0] = 15154 
c    b[31][8][2] = 15155 b[31][8][1] = 15156 b[31][8][0] = 15157 
c    b[31][9][2] = 15158 b[31][9][1] = 15159 b[31][9][0] = 15160 
c    b[31][10][2] = 15161 b[31][10][1] = 15162 b[31][10][0] = 15163 
c    b[31][11][2] = 15164 b[31][11][1] = 15165 b[31][11][0] = 15166 
c    b[31][12][2] = 15167 b[31][12][1] = 15168 b[31][12][0] = 15169 
c    b[31][13][2] = 15170 b[31][13][1] = 15171 b[31][13][0] = 15172 
c    b[31][14][2] = 15173 b[31][14][1] = 15174 b[31][14][0] = 15175 
c    b[31][15][2] = 15176 b[31][15][1] = 15177 b[31][15][0] = 15178 
c    b[31][16][2] = 15179 b[31][16][1] = 15180 b[31][16][0] = 15181 
c    b[31][17][2] = 15182 b[31][17][1] = 15183 b[31][17][0] = 15184 
c    b[31][18][2] = 15185 b[31][18][1] = 15186 b[31][18][0] = 15187 
c    b[31][19][2] = 15188 b[31][19][1] = 15189 b[31][19][0] = 15190 
c    b[31][20][2] = 15191 b[31][20][1] = 15192 b[31][20][0] = 15193 
c    b[31][21][2] = 15194 b[31][21][1] = 15195 b[31][21][0] = 15196 
c    b[31][22][2] = 15197 b[31][22][1] = 15198 b[31][22][0] = 15199 
c    b[31][23][2] = 15200 b[31][23][1] = 15201 b[31][23][0] = 15202 
c    b[31][24][2] = 15203 b[31][24][1] = 15204 b[31][24][0] = 15205 
c    b[31][25][2] = 15206 b[31][25][1] = 15207 b[31][25][0] = 15208 
c    b[31][26][2] = 15209 b[31][26][1] = 15210 b[31][26][0] = 15211 
c    b[31][27][2] = 15212 b[31][27][1] = 15213 b[31][27][0] = 15214 
c    b[31][28][2] = 15215 b[31][28][1] = 15216 b[31][28][0] = 15217 
c    b[31][29][2] = 15218 b[31][29][1] = 15219 b[31][29][0] = 15220 
c    b[31][30][2] = 15221 b[31][30][1] = 15222 b[31][30][0] = 15223 
c    b[31][31][2] = 15224 b[31][31][1] = 15225 b[31][31][0] = 15226 
c    b[31][32][2] = 15227 b[31][32][1] = 15228 b[31][32][0] = 15229 
c    b[31][33][2] = 15230 b[31][33][1] = 15231 b[31][33][0] = 15232 
c    b[31][34][2] = 15233 b[31][34][1] = 15234 b[31][34][0] = 15235 
c    b[31][35][2] = 15236 b[31][35][1] = 15237 b[31][35][0] = 15238 
c    b[31][36][2] = 15239 b[31][36][1] = 15240 b[31][36][0] = 15241 
c    b[31][37][2] = 15242 b[31][37][1] = 15243 b[31][37][0] = 15244 
c    b[31][38][2] = 15245 b[31][38][1] = 15246 b[31][38][0] = 15247 

c    b[32][1][2] = 15248 b[32][1][1] = 15249 b[32][1][0] = 15250 
c    b[32][2][2] = 15251 b[32][2][1] = 15252 b[32][2][0] = 15253 
c    b[32][3][2] = 15254 b[32][3][1] = 15255 b[32][3][0] = 15256 
c    b[32][4][2] = 15257 b[32][4][1] = 15258 b[32][4][0] = 15259 
c    b[32][5][2] = 15260 b[32][5][1] = 15261 b[32][5][0] = 15262 
c    b[32][6][2] = 15263 b[32][6][1] = 15264 b[32][6][0] = 15265 
c    b[32][7][2] = 15266 b[32][7][1] = 15267 b[32][7][0] = 15268 
c    b[32][8][2] = 15269 b[32][8][1] = 15270 b[32][8][0] = 15271 
c    b[32][9][2] = 15272 b[32][9][1] = 15273 b[32][9][0] = 15274 
c    b[32][10][2] = 15275 b[32][10][1] = 15276 b[32][10][0] = 15277 
c    b[32][11][2] = 15278 b[32][11][1] = 15279 b[32][11][0] = 15280 
c    b[32][12][2] = 15281 b[32][12][1] = 15282 b[32][12][0] = 15283 
c    b[32][13][2] = 15284 b[32][13][1] = 15285 b[32][13][0] = 15286 
c    b[32][14][2] = 15287 b[32][14][1] = 15288 b[32][14][0] = 15289 
c    b[32][15][2] = 15290 b[32][15][1] = 15291 b[32][15][0] = 15292 
c    b[32][16][2] = 15293 b[32][16][1] = 15294 b[32][16][0] = 15295 
c    b[32][17][2] = 15296 b[32][17][1] = 15297 b[32][17][0] = 15298 
c    b[32][18][2] = 15299 b[32][18][1] = 15300 b[32][18][0] = 15301 
c    b[32][19][2] = 15302 b[32][19][1] = 15303 b[32][19][0] = 15304 
c    b[32][20][2] = 15305 b[32][20][1] = 15306 b[32][20][0] = 15307 
c    b[32][21][2] = 15308 b[32][21][1] = 15309 b[32][21][0] = 15310 
c    b[32][22][2] = 15311 b[32][22][1] = 15312 b[32][22][0] = 15313 
c    b[32][23][2] = 15314 b[32][23][1] = 15315 b[32][23][0] = 15316 
c    b[32][24][2] = 15317 b[32][24][1] = 15318 b[32][24][0] = 15319 
c    b[32][25][2] = 15320 b[32][25][1] = 15321 b[32][25][0] = 15322 
c    b[32][26][2] = 15323 b[32][26][1] = 15324 b[32][26][0] = 15325 
c    b[32][27][2] = 15326 b[32][27][1] = 15327 b[32][27][0] = 15328 
c    b[32][28][2] = 15329 b[32][28][1] = 15330 b[32][28][0] = 15331 
c    b[32][29][2] = 15332 b[32][29][1] = 15333 b[32][29][0] = 15334 
c    b[32][30][2] = 15335 b[32][30][1] = 15336 b[32][30][0] = 15337 
c    b[32][31][2] = 15338 b[32][31][1] = 15339 b[32][31][0] = 15340 
c    b[32][32][2] = 15341 b[32][32][1] = 15342 b[32][32][0] = 15343 
c    b[32][33][2] = 15344 b[32][33][1] = 15345 b[32][33][0] = 15346 
c    b[32][34][2] = 15347 b[32][34][1] = 15348 b[32][34][0] = 15349 
c    b[32][35][2] = 15350 b[32][35][1] = 15351 b[32][35][0] = 15352 
c    b[32][36][2] = 15353 b[32][36][1] = 15354 b[32][36][0] = 15355 
c    b[32][37][2] = 15356 b[32][37][1] = 15357 b[32][37][0] = 15358 

c    b[33][1][2] = 15359 b[33][1][1] = 15360 b[33][1][0] = 15361 
c    b[33][2][2] = 15362 b[33][2][1] = 15363 b[33][2][0] = 15364 
c    b[33][3][2] = 15365 b[33][3][1] = 15366 b[33][3][0] = 15367 
c    b[33][4][2] = 15368 b[33][4][1] = 15369 b[33][4][0] = 15370 
c    b[33][5][2] = 15371 b[33][5][1] = 15372 b[33][5][0] = 15373 
c    b[33][6][2] = 15374 b[33][6][1] = 15375 b[33][6][0] = 15376 
c    b[33][7][2] = 15377 b[33][7][1] = 15378 b[33][7][0] = 15379 
c    b[33][8][2] = 15380 b[33][8][1] = 15381 b[33][8][0] = 15382 
c    b[33][9][2] = 15383 b[33][9][1] = 15384 b[33][9][0] = 15385 
c    b[33][10][2] = 15386 b[33][10][1] = 15387 b[33][10][0] = 15388 
c    b[33][11][2] = 15389 b[33][11][1] = 15390 b[33][11][0] = 15391 
c    b[33][12][2] = 15392 b[33][12][1] = 15393 b[33][12][0] = 15394 
c    b[33][13][2] = 15395 b[33][13][1] = 15396 b[33][13][0] = 15397 
c    b[33][14][2] = 15398 b[33][14][1] = 15399 b[33][14][0] = 15400 
c    b[33][15][2] = 15401 b[33][15][1] = 15402 b[33][15][0] = 15403 
c    b[33][16][2] = 15404 b[33][16][1] = 15405 b[33][16][0] = 15406 
c    b[33][17][2] = 15407 b[33][17][1] = 15408 b[33][17][0] = 15409 
c    b[33][18][2] = 15410 b[33][18][1] = 15411 b[33][18][0] = 15412 
c    b[33][19][2] = 15413 b[33][19][1] = 15414 b[33][19][0] = 15415 
c    b[33][20][2] = 15416 b[33][20][1] = 15417 b[33][20][0] = 15418 
c    b[33][21][2] = 15419 b[33][21][1] = 15420 b[33][21][0] = 15421 
c    b[33][22][2] = 15422 b[33][22][1] = 15423 b[33][22][0] = 15424 
c    b[33][23][2] = 15425 b[33][23][1] = 15426 b[33][23][0] = 15427 
c    b[33][24][2] = 15428 b[33][24][1] = 15429 b[33][24][0] = 15430 
c    b[33][25][2] = 15431 b[33][25][1] = 15432 b[33][25][0] = 15433 
c    b[33][26][2] = 15434 b[33][26][1] = 15435 b[33][26][0] = 15436 
c    b[33][27][2] = 15437 b[33][27][1] = 15438 b[33][27][0] = 15439 
c    b[33][28][2] = 15440 b[33][28][1] = 15441 b[33][28][0] = 15442 
c    b[33][29][2] = 15443 b[33][29][1] = 15444 b[33][29][0] = 15445 
c    b[33][30][2] = 15446 b[33][30][1] = 15447 b[33][30][0] = 15448 
c    b[33][31][2] = 15449 b[33][31][1] = 15450 b[33][31][0] = 15451 
c    b[33][32][2] = 15452 b[33][32][1] = 15453 b[33][32][0] = 15454 
c    b[33][33][2] = 15455 b[33][33][1] = 15456 b[33][33][0] = 15457 
c    b[33][34][2] = 15458 b[33][34][1] = 15459 b[33][34][0] = 15460 
c    b[33][35][2] = 15461 b[33][35][1] = 15462 b[33][35][0] = 15463 
c    b[33][36][2] = 15464 b[33][36][1] = 15465 b[33][36][0] = 15466 

c    b[34][1][2] = 15467 b[34][1][1] = 15468 b[34][1][0] = 15469 
c    b[34][2][2] = 15470 b[34][2][1] = 15471 b[34][2][0] = 15472 
c    b[34][3][2] = 15473 b[34][3][1] = 15474 b[34][3][0] = 15475 
c    b[34][4][2] = 15476 b[34][4][1] = 15477 b[34][4][0] = 15478 
c    b[34][5][2] = 15479 b[34][5][1] = 15480 b[34][5][0] = 15481 
c    b[34][6][2] = 15482 b[34][6][1] = 15483 b[34][6][0] = 15484 
c    b[34][7][2] = 15485 b[34][7][1] = 15486 b[34][7][0] = 15487 
c    b[34][8][2] = 15488 b[34][8][1] = 15489 b[34][8][0] = 15490 
c    b[34][9][2] = 15491 b[34][9][1] = 15492 b[34][9][0] = 15493 
c    b[34][10][2] = 15494 b[34][10][1] = 15495 b[34][10][0] = 15496 
c    b[34][11][2] = 15497 b[34][11][1] = 15498 b[34][11][0] = 15499 
c    b[34][12][2] = 15500 b[34][12][1] = 15501 b[34][12][0] = 15502 
c    b[34][13][2] = 15503 b[34][13][1] = 15504 b[34][13][0] = 15505 
c    b[34][14][2] = 15506 b[34][14][1] = 15507 b[34][14][0] = 15508 
c    b[34][15][2] = 15509 b[34][15][1] = 15510 b[34][15][0] = 15511 
c    b[34][16][2] = 15512 b[34][16][1] = 15513 b[34][16][0] = 15514 
c    b[34][17][2] = 15515 b[34][17][1] = 15516 b[34][17][0] = 15517 
c    b[34][18][2] = 15518 b[34][18][1] = 15519 b[34][18][0] = 15520 
c    b[34][19][2] = 15521 b[34][19][1] = 15522 b[34][19][0] = 15523 
c    b[34][20][2] = 15524 b[34][20][1] = 15525 b[34][20][0] = 15526 
c    b[34][21][2] = 15527 b[34][21][1] = 15528 b[34][21][0] = 15529 
c    b[34][22][2] = 15530 b[34][22][1] = 15531 b[34][22][0] = 15532 
c    b[34][23][2] = 15533 b[34][23][1] = 15534 b[34][23][0] = 15535 
c    b[34][24][2] = 15536 b[34][24][1] = 15537 b[34][24][0] = 15538 
c    b[34][25][2] = 15539 b[34][25][1] = 15540 b[34][25][0] = 15541 
c    b[34][26][2] = 15542 b[34][26][1] = 15543 b[34][26][0] = 15544 
c    b[34][27][2] = 15545 b[34][27][1] = 15546 b[34][27][0] = 15547 
c    b[34][28][2] = 15548 b[34][28][1] = 15549 b[34][28][0] = 15550 
c    b[34][29][2] = 15551 b[34][29][1] = 15552 b[34][29][0] = 15553 
c    b[34][30][2] = 15554 b[34][30][1] = 15555 b[34][30][0] = 15556 
c    b[34][31][2] = 15557 b[34][31][1] = 15558 b[34][31][0] = 15559 
c    b[34][32][2] = 15560 b[34][32][1] = 15561 b[34][32][0] = 15562 
c    b[34][33][2] = 15563 b[34][33][1] = 15564 b[34][33][0] = 15565 
c    b[34][34][2] = 15566 b[34][34][1] = 15567 b[34][34][0] = 15568 
c    b[34][35][2] = 15569 b[34][35][1] = 15570 b[34][35][0] = 15571 

c    b[35][1][2] = 15572 b[35][1][1] = 15573 b[35][1][0] = 15574 
c    b[35][2][2] = 15575 b[35][2][1] = 15576 b[35][2][0] = 15577 
c    b[35][3][2] = 15578 b[35][3][1] = 15579 b[35][3][0] = 15580 
c    b[35][4][2] = 15581 b[35][4][1] = 15582 b[35][4][0] = 15583 
c    b[35][5][2] = 15584 b[35][5][1] = 15585 b[35][5][0] = 15586 
c    b[35][6][2] = 15587 b[35][6][1] = 15588 b[35][6][0] = 15589 
c    b[35][7][2] = 15590 b[35][7][1] = 15591 b[35][7][0] = 15592 
c    b[35][8][2] = 15593 b[35][8][1] = 15594 b[35][8][0] = 15595 
c    b[35][9][2] = 15596 b[35][9][1] = 15597 b[35][9][0] = 15598 
c    b[35][10][2] = 15599 b[35][10][1] = 15600 b[35][10][0] = 15601 
c    b[35][11][2] = 15602 b[35][11][1] = 15603 b[35][11][0] = 15604 
c    b[35][12][2] = 15605 b[35][12][1] = 15606 b[35][12][0] = 15607 
c    b[35][13][2] = 15608 b[35][13][1] = 15609 b[35][13][0] = 15610 
c    b[35][14][2] = 15611 b[35][14][1] = 15612 b[35][14][0] = 15613 
c    b[35][15][2] = 15614 b[35][15][1] = 15615 b[35][15][0] = 15616 
c    b[35][16][2] = 15617 b[35][16][1] = 15618 b[35][16][0] = 15619 
c    b[35][17][2] = 15620 b[35][17][1] = 15621 b[35][17][0] = 15622 
c    b[35][18][2] = 15623 b[35][18][1] = 15624 b[35][18][0] = 15625 
c    b[35][19][2] = 15626 b[35][19][1] = 15627 b[35][19][0] = 15628 
c    b[35][20][2] = 15629 b[35][20][1] = 15630 b[35][20][0] = 15631 
c    b[35][21][2] = 15632 b[35][21][1] = 15633 b[35][21][0] = 15634 
c    b[35][22][2] = 15635 b[35][22][1] = 15636 b[35][22][0] = 15637 
c    b[35][23][2] = 15638 b[35][23][1] = 15639 b[35][23][0] = 15640 
c    b[35][24][2] = 15641 b[35][24][1] = 15642 b[35][24][0] = 15643 
c    b[35][25][2] = 15644 b[35][25][1] = 15645 b[35][25][0] = 15646 
c    b[35][26][2] = 15647 b[35][26][1] = 15648 b[35][26][0] = 15649 
c    b[35][27][2] = 15650 b[35][27][1] = 15651 b[35][27][0] = 15652 
c    b[35][28][2] = 15653 b[35][28][1] = 15654 b[35][28][0] = 15655 
c    b[35][29][2] = 15656 b[35][29][1] = 15657 b[35][29][0] = 15658 
c    b[35][30][2] = 15659 b[35][30][1] = 15660 b[35][30][0] = 15661 
c    b[35][31][2] = 15662 b[35][31][1] = 15663 b[35][31][0] = 15664 
c    b[35][32][2] = 15665 b[35][32][1] = 15666 b[35][32][0] = 15667 
c    b[35][33][2] = 15668 b[35][33][1] = 15669 b[35][33][0] = 15670 
c    b[35][34][2] = 15671 b[35][34][1] = 15672 b[35][34][0] = 15673 

c    b[36][1][2] = 15674 b[36][1][1] = 15675 b[36][1][0] = 15676 
c    b[36][2][2] = 15677 b[36][2][1] = 15678 b[36][2][0] = 15679 
c    b[36][3][2] = 15680 b[36][3][1] = 15681 b[36][3][0] = 15682 
c    b[36][4][2] = 15683 b[36][4][1] = 15684 b[36][4][0] = 15685 
c    b[36][5][2] = 15686 b[36][5][1] = 15687 b[36][5][0] = 15688 
c    b[36][6][2] = 15689 b[36][6][1] = 15690 b[36][6][0] = 15691 
c    b[36][7][2] = 15692 b[36][7][1] = 15693 b[36][7][0] = 15694 
c    b[36][8][2] = 15695 b[36][8][1] = 15696 b[36][8][0] = 15697 
c    b[36][9][2] = 15698 b[36][9][1] = 15699 b[36][9][0] = 15700 
c    b[36][10][2] = 15701 b[36][10][1] = 15702 b[36][10][0] = 15703 
c    b[36][11][2] = 15704 b[36][11][1] = 15705 b[36][11][0] = 15706 
c    b[36][12][2] = 15707 b[36][12][1] = 15708 b[36][12][0] = 15709 
c    b[36][13][2] = 15710 b[36][13][1] = 15711 b[36][13][0] = 15712 
c    b[36][14][2] = 15713 b[36][14][1] = 15714 b[36][14][0] = 15715 
c    b[36][15][2] = 15716 b[36][15][1] = 15717 b[36][15][0] = 15718 
c    b[36][16][2] = 15719 b[36][16][1] = 15720 b[36][16][0] = 15721 
c    b[36][17][2] = 15722 b[36][17][1] = 15723 b[36][17][0] = 15724 
c    b[36][18][2] = 15725 b[36][18][1] = 15726 b[36][18][0] = 15727 
c    b[36][19][2] = 15728 b[36][19][1] = 15729 b[36][19][0] = 15730 
c    b[36][20][2] = 15731 b[36][20][1] = 15732 b[36][20][0] = 15733 
c    b[36][21][2] = 15734 b[36][21][1] = 15735 b[36][21][0] = 15736 
c    b[36][22][2] = 15737 b[36][22][1] = 15738 b[36][22][0] = 15739 
c    b[36][23][2] = 15740 b[36][23][1] = 15741 b[36][23][0] = 15742 
c    b[36][24][2] = 15743 b[36][24][1] = 15744 b[36][24][0] = 15745 
c    b[36][25][2] = 15746 b[36][25][1] = 15747 b[36][25][0] = 15748 
c    b[36][26][2] = 15749 b[36][26][1] = 15750 b[36][26][0] = 15751 
c    b[36][27][2] = 15752 b[36][27][1] = 15753 b[36][27][0] = 15754 
c    b[36][28][2] = 15755 b[36][28][1] = 15756 b[36][28][0] = 15757 
c    b[36][29][2] = 15758 b[36][29][1] = 15759 b[36][29][0] = 15760 
c    b[36][30][2] = 15761 b[36][30][1] = 15762 b[36][30][0] = 15763 
c    b[36][31][2] = 15764 b[36][31][1] = 15765 b[36][31][0] = 15766 
c    b[36][32][2] = 15767 b[36][32][1] = 15768 b[36][32][0] = 15769 
c    b[36][33][2] = 15770 b[36][33][1] = 15771 b[36][33][0] = 15772 

c    b[37][1][2] = 15773 b[37][1][1] = 15774 b[37][1][0] = 15775 
c    b[37][2][2] = 15776 b[37][2][1] = 15777 b[37][2][0] = 15778 
c    b[37][3][2] = 15779 b[37][3][1] = 15780 b[37][3][0] = 15781 
c    b[37][4][2] = 15782 b[37][4][1] = 15783 b[37][4][0] = 15784 
c    b[37][5][2] = 15785 b[37][5][1] = 15786 b[37][5][0] = 15787 
c    b[37][6][2] = 15788 b[37][6][1] = 15789 b[37][6][0] = 15790 
c    b[37][7][2] = 15791 b[37][7][1] = 15792 b[37][7][0] = 15793 
c    b[37][8][2] = 15794 b[37][8][1] = 15795 b[37][8][0] = 15796 
c    b[37][9][2] = 15797 b[37][9][1] = 15798 b[37][9][0] = 15799 
c    b[37][10][2] = 15800 b[37][10][1] = 15801 b[37][10][0] = 15802 
c    b[37][11][2] = 15803 b[37][11][1] = 15804 b[37][11][0] = 15805 
c    b[37][12][2] = 15806 b[37][12][1] = 15807 b[37][12][0] = 15808 
c    b[37][13][2] = 15809 b[37][13][1] = 15810 b[37][13][0] = 15811 
c    b[37][14][2] = 15812 b[37][14][1] = 15813 b[37][14][0] = 15814 
c    b[37][15][2] = 15815 b[37][15][1] = 15816 b[37][15][0] = 15817 
c    b[37][16][2] = 15818 b[37][16][1] = 15819 b[37][16][0] = 15820 
c    b[37][17][2] = 15821 b[37][17][1] = 15822 b[37][17][0] = 15823 
c    b[37][18][2] = 15824 b[37][18][1] = 15825 b[37][18][0] = 15826 
c    b[37][19][2] = 15827 b[37][19][1] = 15828 b[37][19][0] = 15829 
c    b[37][20][2] = 15830 b[37][20][1] = 15831 b[37][20][0] = 15832 
c    b[37][21][2] = 15833 b[37][21][1] = 15834 b[37][21][0] = 15835 
c    b[37][22][2] = 15836 b[37][22][1] = 15837 b[37][22][0] = 15838 
c    b[37][23][2] = 15839 b[37][23][1] = 15840 b[37][23][0] = 15841 
c    b[37][24][2] = 15842 b[37][24][1] = 15843 b[37][24][0] = 15844 
c    b[37][25][2] = 15845 b[37][25][1] = 15846 b[37][25][0] = 15847 
c    b[37][26][2] = 15848 b[37][26][1] = 15849 b[37][26][0] = 15850 
c    b[37][27][2] = 15851 b[37][27][1] = 15852 b[37][27][0] = 15853 
c    b[37][28][2] = 15854 b[37][28][1] = 15855 b[37][28][0] = 15856 
c    b[37][29][2] = 15857 b[37][29][1] = 15858 b[37][29][0] = 15859 
c    b[37][30][2] = 15860 b[37][30][1] = 15861 b[37][30][0] = 15862 
c    b[37][31][2] = 15863 b[37][31][1] = 15864 b[37][31][0] = 15865 
c    b[37][32][2] = 15866 b[37][32][1] = 15867 b[37][32][0] = 15868 

c    b[38][1][2] = 15869 b[38][1][1] = 15870 b[38][1][0] = 15871 
c    b[38][2][2] = 15872 b[38][2][1] = 15873 b[38][2][0] = 15874 
c    b[38][3][2] = 15875 b[38][3][1] = 15876 b[38][3][0] = 15877 
c    b[38][4][2] = 15878 b[38][4][1] = 15879 b[38][4][0] = 15880 
c    b[38][5][2] = 15881 b[38][5][1] = 15882 b[38][5][0] = 15883 
c    b[38][6][2] = 15884 b[38][6][1] = 15885 b[38][6][0] = 15886 
c    b[38][7][2] = 15887 b[38][7][1] = 15888 b[38][7][0] = 15889 
c    b[38][8][2] = 15890 b[38][8][1] = 15891 b[38][8][0] = 15892 
c    b[38][9][2] = 15893 b[38][9][1] = 15894 b[38][9][0] = 15895 
c    b[38][10][2] = 15896 b[38][10][1] = 15897 b[38][10][0] = 15898 
c    b[38][11][2] = 15899 b[38][11][1] = 15900 b[38][11][0] = 15901 
c    b[38][12][2] = 15902 b[38][12][1] = 15903 b[38][12][0] = 15904 
c    b[38][13][2] = 15905 b[38][13][1] = 15906 b[38][13][0] = 15907 
c    b[38][14][2] = 15908 b[38][14][1] = 15909 b[38][14][0] = 15910 
c    b[38][15][2] = 15911 b[38][15][1] = 15912 b[38][15][0] = 15913 
c    b[38][16][2] = 15914 b[38][16][1] = 15915 b[38][16][0] = 15916 
c    b[38][17][2] = 15917 b[38][17][1] = 15918 b[38][17][0] = 15919 
c    b[38][18][2] = 15920 b[38][18][1] = 15921 b[38][18][0] = 15922 
c    b[38][19][2] = 15923 b[38][19][1] = 15924 b[38][19][0] = 15925 
c    b[38][20][2] = 15926 b[38][20][1] = 15927 b[38][20][0] = 15928 
c    b[38][21][2] = 15929 b[38][21][1] = 15930 b[38][21][0] = 15931 
c    b[38][22][2] = 15932 b[38][22][1] = 15933 b[38][22][0] = 15934 
c    b[38][23][2] = 15935 b[38][23][1] = 15936 b[38][23][0] = 15937 
c    b[38][24][2] = 15938 b[38][24][1] = 15939 b[38][24][0] = 15940 
c    b[38][25][2] = 15941 b[38][25][1] = 15942 b[38][25][0] = 15943 
c    b[38][26][2] = 15944 b[38][26][1] = 15945 b[38][26][0] = 15946 
c    b[38][27][2] = 15947 b[38][27][1] = 15948 b[38][27][0] = 15949 
c    b[38][28][2] = 15950 b[38][28][1] = 15951 b[38][28][0] = 15952 
c    b[38][29][2] = 15953 b[38][29][1] = 15954 b[38][29][0] = 15955 
c    b[38][30][2] = 15956 b[38][30][1] = 15957 b[38][30][0] = 15958 
c    b[38][31][2] = 15959 b[38][31][1] = 15960 b[38][31][0] = 15961 

c    b[39][1][2] = 15962 b[39][1][1] = 15963 b[39][1][0] = 15964 
c    b[39][2][2] = 15965 b[39][2][1] = 15966 b[39][2][0] = 15967 
c    b[39][3][2] = 15968 b[39][3][1] = 15969 b[39][3][0] = 15970 
c    b[39][4][2] = 15971 b[39][4][1] = 15972 b[39][4][0] = 15973 
c    b[39][5][2] = 15974 b[39][5][1] = 15975 b[39][5][0] = 15976 
c    b[39][6][2] = 15977 b[39][6][1] = 15978 b[39][6][0] = 15979 
c    b[39][7][2] = 15980 b[39][7][1] = 15981 b[39][7][0] = 15982 
c    b[39][8][2] = 15983 b[39][8][1] = 15984 b[39][8][0] = 15985 
c    b[39][9][2] = 15986 b[39][9][1] = 15987 b[39][9][0] = 15988 
c    b[39][10][2] = 15989 b[39][10][1] = 15990 b[39][10][0] = 15991 
c    b[39][11][2] = 15992 b[39][11][1] = 15993 b[39][11][0] = 15994 
c    b[39][12][2] = 15995 b[39][12][1] = 15996 b[39][12][0] = 15997 
c    b[39][13][2] = 15998 b[39][13][1] = 15999 b[39][13][0] = 16000 
c    b[39][14][2] = 16001 b[39][14][1] = 16002 b[39][14][0] = 16003 
c    b[39][15][2] = 16004 b[39][15][1] = 16005 b[39][15][0] = 16006 
c    b[39][16][2] = 16007 b[39][16][1] = 16008 b[39][16][0] = 16009 
c    b[39][17][2] = 16010 b[39][17][1] = 16011 b[39][17][0] = 16012 
c    b[39][18][2] = 16013 b[39][18][1] = 16014 b[39][18][0] = 16015 
c    b[39][19][2] = 16016 b[39][19][1] = 16017 b[39][19][0] = 16018 
c    b[39][20][2] = 16019 b[39][20][1] = 16020 b[39][20][0] = 16021 
c    b[39][21][2] = 16022 b[39][21][1] = 16023 b[39][21][0] = 16024 
c    b[39][22][2] = 16025 b[39][22][1] = 16026 b[39][22][0] = 16027 
c    b[39][23][2] = 16028 b[39][23][1] = 16029 b[39][23][0] = 16030 
c    b[39][24][2] = 16031 b[39][24][1] = 16032 b[39][24][0] = 16033 
c    b[39][25][2] = 16034 b[39][25][1] = 16035 b[39][25][0] = 16036 
c    b[39][26][2] = 16037 b[39][26][1] = 16038 b[39][26][0] = 16039 
c    b[39][27][2] = 16040 b[39][27][1] = 16041 b[39][27][0] = 16042 
c    b[39][28][2] = 16043 b[39][28][1] = 16044 b[39][28][0] = 16045 
c    b[39][29][2] = 16046 b[39][29][1] = 16047 b[39][29][0] = 16048 
c    b[39][30][2] = 16049 b[39][30][1] = 16050 b[39][30][0] = 16051 

c    b[40][1][2] = 16052 b[40][1][1] = 16053 b[40][1][0] = 16054 
c    b[40][2][2] = 16055 b[40][2][1] = 16056 b[40][2][0] = 16057 
c    b[40][3][2] = 16058 b[40][3][1] = 16059 b[40][3][0] = 16060 
c    b[40][4][2] = 16061 b[40][4][1] = 16062 b[40][4][0] = 16063 
c    b[40][5][2] = 16064 b[40][5][1] = 16065 b[40][5][0] = 16066 
c    b[40][6][2] = 16067 b[40][6][1] = 16068 b[40][6][0] = 16069 
c    b[40][7][2] = 16070 b[40][7][1] = 16071 b[40][7][0] = 16072 
c    b[40][8][2] = 16073 b[40][8][1] = 16074 b[40][8][0] = 16075 
c    b[40][9][2] = 16076 b[40][9][1] = 16077 b[40][9][0] = 16078 
c    b[40][10][2] = 16079 b[40][10][1] = 16080 b[40][10][0] = 16081 
c    b[40][11][2] = 16082 b[40][11][1] = 16083 b[40][11][0] = 16084 
c    b[40][12][2] = 16085 b[40][12][1] = 16086 b[40][12][0] = 16087 
c    b[40][13][2] = 16088 b[40][13][1] = 16089 b[40][13][0] = 16090 
c    b[40][14][2] = 16091 b[40][14][1] = 16092 b[40][14][0] = 16093 
c    b[40][15][2] = 16094 b[40][15][1] = 16095 b[40][15][0] = 16096 
c    b[40][16][2] = 16097 b[40][16][1] = 16098 b[40][16][0] = 16099 
c    b[40][17][2] = 16100 b[40][17][1] = 16101 b[40][17][0] = 16102 
c    b[40][18][2] = 16103 b[40][18][1] = 16104 b[40][18][0] = 16105 
c    b[40][19][2] = 16106 b[40][19][1] = 16107 b[40][19][0] = 16108 
c    b[40][20][2] = 16109 b[40][20][1] = 16110 b[40][20][0] = 16111 
c    b[40][21][2] = 16112 b[40][21][1] = 16113 b[40][21][0] = 16114 
c    b[40][22][2] = 16115 b[40][22][1] = 16116 b[40][22][0] = 16117 
c    b[40][23][2] = 16118 b[40][23][1] = 16119 b[40][23][0] = 16120 
c    b[40][24][2] = 16121 b[40][24][1] = 16122 b[40][24][0] = 16123 
c    b[40][25][2] = 16124 b[40][25][1] = 16125 b[40][25][0] = 16126 
c    b[40][26][2] = 16127 b[40][26][1] = 16128 b[40][26][0] = 16129 
c    b[40][27][2] = 16130 b[40][27][1] = 16131 b[40][27][0] = 16132 
c    b[40][28][2] = 16133 b[40][28][1] = 16134 b[40][28][0] = 16135 
c    b[40][29][2] = 16136 b[40][29][1] = 16137 b[40][29][0] = 16138 
c    b[40][30][2] = 16139 b[40][30][1] = 16140 b[40][30][0] = 16141 

c    b[41][1][2] = 16142 b[41][1][1] = 16143 b[41][1][0] = 16144 
c    b[41][2][2] = 16145 b[41][2][1] = 16146 b[41][2][0] = 16147 
c    b[41][3][2] = 16148 b[41][3][1] = 16149 b[41][3][0] = 16150 
c    b[41][4][2] = 16151 b[41][4][1] = 16152 b[41][4][0] = 16153 
c    b[41][5][2] = 16154 b[41][5][1] = 16155 b[41][5][0] = 16156 
c    b[41][6][2] = 16157 b[41][6][1] = 16158 b[41][6][0] = 16159 
c    b[41][7][2] = 16160 b[41][7][1] = 16161 b[41][7][0] = 16162 
c    b[41][8][2] = 16163 b[41][8][1] = 16164 b[41][8][0] = 16165 
c    b[41][9][2] = 16166 b[41][9][1] = 16167 b[41][9][0] = 16168 
c    b[41][10][2] = 16169 b[41][10][1] = 16170 b[41][10][0] = 16171 
c    b[41][11][2] = 16172 b[41][11][1] = 16173 b[41][11][0] = 16174 
c    b[41][12][2] = 16175 b[41][12][1] = 16176 b[41][12][0] = 16177 
c    b[41][13][2] = 16178 b[41][13][1] = 16179 b[41][13][0] = 16180 
c    b[41][14][2] = 16181 b[41][14][1] = 16182 b[41][14][0] = 16183 
c    b[41][15][2] = 16184 b[41][15][1] = 16185 b[41][15][0] = 16186 
c    b[41][16][2] = 16187 b[41][16][1] = 16188 b[41][16][0] = 16189 
c    b[41][17][2] = 16190 b[41][17][1] = 16191 b[41][17][0] = 16192 
c    b[41][18][2] = 16193 b[41][18][1] = 16194 b[41][18][0] = 16195 
c    b[41][19][2] = 16196 b[41][19][1] = 16197 b[41][19][0] = 16198 
c    b[41][20][2] = 16199 b[41][20][1] = 16200 b[41][20][0] = 16201 
c    b[41][21][2] = 16202 b[41][21][1] = 16203 b[41][21][0] = 16204 
c    b[41][22][2] = 16205 b[41][22][1] = 16206 b[41][22][0] = 16207 
c    b[41][23][2] = 16208 b[41][23][1] = 16209 b[41][23][0] = 16210 
c    b[41][24][2] = 16211 b[41][24][1] = 16212 b[41][24][0] = 16213 
c    b[41][25][2] = 16214 b[41][25][1] = 16215 b[41][25][0] = 16216 
c    b[41][26][2] = 16217 b[41][26][1] = 16218 b[41][26][0] = 16219 
c    b[41][27][2] = 16220 b[41][27][1] = 16221 b[41][27][0] = 16222 
c    b[41][28][2] = 16223 b[41][28][1] = 16224 b[41][28][0] = 16225 
c    b[41][29][2] = 16226 b[41][29][1] = 16227 b[41][29][0] = 16228 

c    b[42][1][2] = 16229 b[42][1][1] = 16230 b[42][1][0] = 16231 
c    b[42][2][2] = 16232 b[42][2][1] = 16233 b[42][2][0] = 16234 
c    b[42][3][2] = 16235 b[42][3][1] = 16236 b[42][3][0] = 16237 
c    b[42][4][2] = 16238 b[42][4][1] = 16239 b[42][4][0] = 16240 
c    b[42][5][2] = 16241 b[42][5][1] = 16242 b[42][5][0] = 16243 
c    b[42][6][2] = 16244 b[42][6][1] = 16245 b[42][6][0] = 16246 
c    b[42][7][2] = 16247 b[42][7][1] = 16248 b[42][7][0] = 16249 
c    b[42][8][2] = 16250 b[42][8][1] = 16251 b[42][8][0] = 16252 
c    b[42][9][2] = 16253 b[42][9][1] = 16254 b[42][9][0] = 16255 
c    b[42][10][2] = 16256 b[42][10][1] = 16257 b[42][10][0] = 16258 
c    b[42][11][2] = 16259 b[42][11][1] = 16260 b[42][11][0] = 16261 
c    b[42][12][2] = 16262 b[42][12][1] = 16263 b[42][12][0] = 16264 
c    b[42][13][2] = 16265 b[42][13][1] = 16266 b[42][13][0] = 16267 
c    b[42][14][2] = 16268 b[42][14][1] = 16269 b[42][14][0] = 16270 
c    b[42][15][2] = 16271 b[42][15][1] = 16272 b[42][15][0] = 16273 
c    b[42][16][2] = 16274 b[42][16][1] = 16275 b[42][16][0] = 16276 
c    b[42][17][2] = 16277 b[42][17][1] = 16278 b[42][17][0] = 16279 
c    b[42][18][2] = 16280 b[42][18][1] = 16281 b[42][18][0] = 16282 
c    b[42][19][2] = 16283 b[42][19][1] = 16284 b[42][19][0] = 16285 
c    b[42][20][2] = 16286 b[42][20][1] = 16287 b[42][20][0] = 16288 
c    b[42][21][2] = 16289 b[42][21][1] = 16290 b[42][21][0] = 16291 
c    b[42][22][2] = 16292 b[42][22][1] = 16293 b[42][22][0] = 16294 
c    b[42][23][2] = 16295 b[42][23][1] = 16296 b[42][23][0] = 16297 
c    b[42][24][2] = 16298 b[42][24][1] = 16299 b[42][24][0] = 16300 
c    b[42][25][2] = 16301 b[42][25][1] = 16302 b[42][25][0] = 16303 
c    b[42][26][2] = 16304 b[42][26][1] = 16305 b[42][26][0] = 16306 
c    b[42][27][2] = 16307 b[42][27][1] = 16308 b[42][27][0] = 16309 
c    b[42][28][2] = 16310 b[42][28][1] = 16311 b[42][28][0] = 16312 

c    b[43][1][2] = 16313 b[43][1][1] = 16314 b[43][1][0] = 16315 
c    b[43][2][2] = 16316 b[43][2][1] = 16317 b[43][2][0] = 16318 
c    b[43][3][2] = 16319 b[43][3][1] = 16320 b[43][3][0] = 16321 
c    b[43][4][2] = 16322 b[43][4][1] = 16323 b[43][4][0] = 16324 
c    b[43][5][2] = 16325 b[43][5][1] = 16326 b[43][5][0] = 16327 
c    b[43][6][2] = 16328 b[43][6][1] = 16329 b[43][6][0] = 16330 
c    b[43][7][2] = 16331 b[43][7][1] = 16332 b[43][7][0] = 16333 
c    b[43][8][2] = 16334 b[43][8][1] = 16335 b[43][8][0] = 16336 
c    b[43][9][2] = 16337 b[43][9][1] = 16338 b[43][9][0] = 16339 
c    b[43][10][2] = 16340 b[43][10][1] = 16341 b[43][10][0] = 16342 
c    b[43][11][2] = 16343 b[43][11][1] = 16344 b[43][11][0] = 16345 
c    b[43][12][2] = 16346 b[43][12][1] = 16347 b[43][12][0] = 16348 
c    b[43][13][2] = 16349 b[43][13][1] = 16350 b[43][13][0] = 16351 
c    b[43][14][2] = 16352 b[43][14][1] = 16353 b[43][14][0] = 16354 
c    b[43][15][2] = 16355 b[43][15][1] = 16356 b[43][15][0] = 16357 
c    b[43][16][2] = 16358 b[43][16][1] = 16359 b[43][16][0] = 16360 
c    b[43][17][2] = 16361 b[43][17][1] = 16362 b[43][17][0] = 16363 
c    b[43][18][2] = 16364 b[43][18][1] = 16365 b[43][18][0] = 16366 
c    b[43][19][2] = 16367 b[43][19][1] = 16368 b[43][19][0] = 16369 
c    b[43][20][2] = 16370 b[43][20][1] = 16371 b[43][20][0] = 16372 
c    b[43][21][2] = 16373 b[43][21][1] = 16374 b[43][21][0] = 16375 
c    b[43][22][2] = 16376 b[43][22][1] = 16377 b[43][22][0] = 16378 
c    b[43][23][2] = 16379 b[43][23][1] = 16380 b[43][23][0] = 16381 
c    b[43][24][2] = 16382 b[43][24][1] = 16383 b[43][24][0] = 16384 
c    b[43][25][2] = 16385 b[43][25][1] = 16386 b[43][25][0] = 16387 
c    b[43][26][2] = 16388 b[43][26][1] = 16389 b[43][26][0] = 16390 
c    b[43][27][2] = 16391 b[43][27][1] = 16392 b[43][27][0] = 16393 
c    b[43][28][2] = 16394 b[43][28][1] = 16395 b[43][28][0] = 16396 

c    b[44][1][2] = 16397 b[44][1][1] = 16398 b[44][1][0] = 16399 
c    b[44][2][2] = 16400 b[44][2][1] = 16401 b[44][2][0] = 16402 
c    b[44][3][2] = 16403 b[44][3][1] = 16404 b[44][3][0] = 16405 
c    b[44][4][2] = 16406 b[44][4][1] = 16407 b[44][4][0] = 16408 
c    b[44][5][2] = 16409 b[44][5][1] = 16410 b[44][5][0] = 16411 
c    b[44][6][2] = 16412 b[44][6][1] = 16413 b[44][6][0] = 16414 
c    b[44][7][2] = 16415 b[44][7][1] = 16416 b[44][7][0] = 16417 
c    b[44][8][2] = 16418 b[44][8][1] = 16419 b[44][8][0] = 16420 
c    b[44][9][2] = 16421 b[44][9][1] = 16422 b[44][9][0] = 16423 
c    b[44][10][2] = 16424 b[44][10][1] = 16425 b[44][10][0] = 16426 
c    b[44][11][2] = 16427 b[44][11][1] = 16428 b[44][11][0] = 16429 
c    b[44][12][2] = 16430 b[44][12][1] = 16431 b[44][12][0] = 16432 
c    b[44][13][2] = 16433 b[44][13][1] = 16434 b[44][13][0] = 16435 
c    b[44][14][2] = 16436 b[44][14][1] = 16437 b[44][14][0] = 16438 
c    b[44][15][2] = 16439 b[44][15][1] = 16440 b[44][15][0] = 16441 
c    b[44][16][2] = 16442 b[44][16][1] = 16443 b[44][16][0] = 16444 
c    b[44][17][2] = 16445 b[44][17][1] = 16446 b[44][17][0] = 16447 
c    b[44][18][2] = 16448 b[44][18][1] = 16449 b[44][18][0] = 16450 
c    b[44][19][2] = 16451 b[44][19][1] = 16452 b[44][19][0] = 16453 
c    b[44][20][2] = 16454 b[44][20][1] = 16455 b[44][20][0] = 16456 
c    b[44][21][2] = 16457 b[44][21][1] = 16458 b[44][21][0] = 16459 
c    b[44][22][2] = 16460 b[44][22][1] = 16461 b[44][22][0] = 16462 
c    b[44][23][2] = 16463 b[44][23][1] = 16464 b[44][23][0] = 16465 
c    b[44][24][2] = 16466 b[44][24][1] = 16467 b[44][24][0] = 16468 
c    b[44][25][2] = 16469 b[44][25][1] = 16470 b[44][25][0] = 16471 
c    b[44][26][2] = 16472 b[44][26][1] = 16473 b[44][26][0] = 16474 
c    b[44][27][2] = 16475 b[44][27][1] = 16476 b[44][27][0] = 16477 

c    b[45][1][2] = 16478 b[45][1][1] = 16479 b[45][1][0] = 16480 
c    b[45][2][2] = 16481 b[45][2][1] = 16482 b[45][2][0] = 16483 
c    b[45][3][2] = 16484 b[45][3][1] = 16485 b[45][3][0] = 16486 
c    b[45][4][2] = 16487 b[45][4][1] = 16488 b[45][4][0] = 16489 
c    b[45][5][2] = 16490 b[45][5][1] = 16491 b[45][5][0] = 16492 
c    b[45][6][2] = 16493 b[45][6][1] = 16494 b[45][6][0] = 16495 
c    b[45][7][2] = 16496 b[45][7][1] = 16497 b[45][7][0] = 16498 
c    b[45][8][2] = 16499 b[45][8][1] = 16500 b[45][8][0] = 16501 
c    b[45][9][2] = 16502 b[45][9][1] = 16503 b[45][9][0] = 16504 
c    b[45][10][2] = 16505 b[45][10][1] = 16506 b[45][10][0] = 16507 
c    b[45][11][2] = 16508 b[45][11][1] = 16509 b[45][11][0] = 16510 
c    b[45][12][2] = 16511 b[45][12][1] = 16512 b[45][12][0] = 16513 
c    b[45][13][2] = 16514 b[45][13][1] = 16515 b[45][13][0] = 16516 
c    b[45][14][2] = 16517 b[45][14][1] = 16518 b[45][14][0] = 16519 
c    b[45][15][2] = 16520 b[45][15][1] = 16521 b[45][15][0] = 16522 
c    b[45][16][2] = 16523 b[45][16][1] = 16524 b[45][16][0] = 16525 
c    b[45][17][2] = 16526 b[45][17][1] = 16527 b[45][17][0] = 16528 
c    b[45][18][2] = 16529 b[45][18][1] = 16530 b[45][18][0] = 16531 
c    b[45][19][2] = 16532 b[45][19][1] = 16533 b[45][19][0] = 16534 
c    b[45][20][2] = 16535 b[45][20][1] = 16536 b[45][20][0] = 16537 
c    b[45][21][2] = 16538 b[45][21][1] = 16539 b[45][21][0] = 16540 
c    b[45][22][2] = 16541 b[45][22][1] = 16542 b[45][22][0] = 16543 
c    b[45][23][2] = 16544 b[45][23][1] = 16545 b[45][23][0] = 16546 
c    b[45][24][2] = 16547 b[45][24][1] = 16548 b[45][24][0] = 16549 
c    b[45][25][2] = 16550 b[45][25][1] = 16551 b[45][25][0] = 16552 
c    b[45][26][2] = 16553 b[45][26][1] = 16554 b[45][26][0] = 16555 

c    b[46][1][2] = 16556 b[46][1][1] = 16557 b[46][1][0] = 16558 
c    b[46][2][2] = 16559 b[46][2][1] = 16560 b[46][2][0] = 16561 
c    b[46][3][2] = 16562 b[46][3][1] = 16563 b[46][3][0] = 16564 
c    b[46][4][2] = 16565 b[46][4][1] = 16566 b[46][4][0] = 16567 
c    b[46][5][2] = 16568 b[46][5][1] = 16569 b[46][5][0] = 16570 
c    b[46][6][2] = 16571 b[46][6][1] = 16572 b[46][6][0] = 16573 
c    b[46][7][2] = 16574 b[46][7][1] = 16575 b[46][7][0] = 16576 
c    b[46][8][2] = 16577 b[46][8][1] = 16578 b[46][8][0] = 16579 
c    b[46][9][2] = 16580 b[46][9][1] = 16581 b[46][9][0] = 16582 
c    b[46][10][2] = 16583 b[46][10][1] = 16584 b[46][10][0] = 16585 
c    b[46][11][2] = 16586 b[46][11][1] = 16587 b[46][11][0] = 16588 
c    b[46][12][2] = 16589 b[46][12][1] = 16590 b[46][12][0] = 16591 
c    b[46][13][2] = 16592 b[46][13][1] = 16593 b[46][13][0] = 16594 
c    b[46][14][2] = 16595 b[46][14][1] = 16596 b[46][14][0] = 16597 
c    b[46][15][2] = 16598 b[46][15][1] = 16599 b[46][15][0] = 16600 
c    b[46][16][2] = 16601 b[46][16][1] = 16602 b[46][16][0] = 16603 
c    b[46][17][2] = 16604 b[46][17][1] = 16605 b[46][17][0] = 16606 
c    b[46][18][2] = 16607 b[46][18][1] = 16608 b[46][18][0] = 16609 
c    b[46][19][2] = 16610 b[46][19][1] = 16611 b[46][19][0] = 16612 
c    b[46][20][2] = 16613 b[46][20][1] = 16614 b[46][20][0] = 16615 
c    b[46][21][2] = 16616 b[46][21][1] = 16617 b[46][21][0] = 16618 
c    b[46][22][2] = 16619 b[46][22][1] = 16620 b[46][22][0] = 16621 
c    b[46][23][2] = 16622 b[46][23][1] = 16623 b[46][23][0] = 16624 
c    b[46][24][2] = 16625 b[46][24][1] = 16626 b[46][24][0] = 16627 
c    b[46][25][2] = 16628 b[46][25][1] = 16629 b[46][25][0] = 16630 
c    b[46][26][2] = 16631 b[46][26][1] = 16632 b[46][26][0] = 16633 

c    b[47][1][2] = 16634 b[47][1][1] = 16635 b[47][1][0] = 16636 
c    b[47][2][2] = 16637 b[47][2][1] = 16638 b[47][2][0] = 16639 
c    b[47][3][2] = 16640 b[47][3][1] = 16641 b[47][3][0] = 16642 
c    b[47][4][2] = 16643 b[47][4][1] = 16644 b[47][4][0] = 16645 
c    b[47][5][2] = 16646 b[47][5][1] = 16647 b[47][5][0] = 16648 
c    b[47][6][2] = 16649 b[47][6][1] = 16650 b[47][6][0] = 16651 
c    b[47][7][2] = 16652 b[47][7][1] = 16653 b[47][7][0] = 16654 
c    b[47][8][2] = 16655 b[47][8][1] = 16656 b[47][8][0] = 16657 
c    b[47][9][2] = 16658 b[47][9][1] = 16659 b[47][9][0] = 16660 
c    b[47][10][2] = 16661 b[47][10][1] = 16662 b[47][10][0] = 16663 
c    b[47][11][2] = 16664 b[47][11][1] = 16665 b[47][11][0] = 16666 
c    b[47][12][2] = 16667 b[47][12][1] = 16668 b[47][12][0] = 16669 
c    b[47][13][2] = 16670 b[47][13][1] = 16671 b[47][13][0] = 16672 
c    b[47][14][2] = 16673 b[47][14][1] = 16674 b[47][14][0] = 16675 
c    b[47][15][2] = 16676 b[47][15][1] = 16677 b[47][15][0] = 16678 
c    b[47][16][2] = 16679 b[47][16][1] = 16680 b[47][16][0] = 16681 
c    b[47][17][2] = 16682 b[47][17][1] = 16683 b[47][17][0] = 16684 
c    b[47][18][2] = 16685 b[47][18][1] = 16686 b[47][18][0] = 16687 
c    b[47][19][2] = 16688 b[47][19][1] = 16689 b[47][19][0] = 16690 
c    b[47][20][2] = 16691 b[47][20][1] = 16692 b[47][20][0] = 16693 
c    b[47][21][2] = 16694 b[47][21][1] = 16695 b[47][21][0] = 16696 
c    b[47][22][2] = 16697 b[47][22][1] = 16698 b[47][22][0] = 16699 
c    b[47][23][2] = 16700 b[47][23][1] = 16701 b[47][23][0] = 16702 
c    b[47][24][2] = 16703 b[47][24][1] = 16704 b[47][24][0] = 16705 
c    b[47][25][2] = 16706 b[47][25][1] = 16707 b[47][25][0] = 16708 

c    b[48][1][2] = 16709 b[48][1][1] = 16710 b[48][1][0] = 16711 
c    b[48][2][2] = 16712 b[48][2][1] = 16713 b[48][2][0] = 16714 
c    b[48][3][2] = 16715 b[48][3][1] = 16716 b[48][3][0] = 16717 
c    b[48][4][2] = 16718 b[48][4][1] = 16719 b[48][4][0] = 16720 
c    b[48][5][2] = 16721 b[48][5][1] = 16722 b[48][5][0] = 16723 
c    b[48][6][2] = 16724 b[48][6][1] = 16725 b[48][6][0] = 16726 
c    b[48][7][2] = 16727 b[48][7][1] = 16728 b[48][7][0] = 16729 
c    b[48][8][2] = 16730 b[48][8][1] = 16731 b[48][8][0] = 16732 
c    b[48][9][2] = 16733 b[48][9][1] = 16734 b[48][9][0] = 16735 
c    b[48][10][2] = 16736 b[48][10][1] = 16737 b[48][10][0] = 16738 
c    b[48][11][2] = 16739 b[48][11][1] = 16740 b[48][11][0] = 16741 
c    b[48][12][2] = 16742 b[48][12][1] = 16743 b[48][12][0] = 16744 
c    b[48][13][2] = 16745 b[48][13][1] = 16746 b[48][13][0] = 16747 
c    b[48][14][2] = 16748 b[48][14][1] = 16749 b[48][14][0] = 16750 
c    b[48][15][2] = 16751 b[48][15][1] = 16752 b[48][15][0] = 16753 
c    b[48][16][2] = 16754 b[48][16][1] = 16755 b[48][16][0] = 16756 
c    b[48][17][2] = 16757 b[48][17][1] = 16758 b[48][17][0] = 16759 
c    b[48][18][2] = 16760 b[48][18][1] = 16761 b[48][18][0] = 16762 
c    b[48][19][2] = 16763 b[48][19][1] = 16764 b[48][19][0] = 16765 
c    b[48][20][2] = 16766 b[48][20][1] = 16767 b[48][20][0] = 16768 
c    b[48][21][2] = 16769 b[48][21][1] = 16770 b[48][21][0] = 16771 
c    b[48][22][2] = 16772 b[48][22][1] = 16773 b[48][22][0] = 16774 
c    b[48][23][2] = 16775 b[48][23][1] = 16776 b[48][23][0] = 16777 
c    b[48][24][2] = 16778 b[48][24][1] = 16779 b[48][24][0] = 16780 
c    b[48][25][2] = 16781 b[48][25][1] = 16782 b[48][25][0] = 16783 

c    b[49][1][2] = 16784 b[49][1][1] = 16785 b[49][1][0] = 16786 
c    b[49][2][2] = 16787 b[49][2][1] = 16788 b[49][2][0] = 16789 
c    b[49][3][2] = 16790 b[49][3][1] = 16791 b[49][3][0] = 16792 
c    b[49][4][2] = 16793 b[49][4][1] = 16794 b[49][4][0] = 16795 
c    b[49][5][2] = 16796 b[49][5][1] = 16797 b[49][5][0] = 16798 
c    b[49][6][2] = 16799 b[49][6][1] = 16800 b[49][6][0] = 16801 
c    b[49][7][2] = 16802 b[49][7][1] = 16803 b[49][7][0] = 16804 
c    b[49][8][2] = 16805 b[49][8][1] = 16806 b[49][8][0] = 16807 
c    b[49][9][2] = 16808 b[49][9][1] = 16809 b[49][9][0] = 16810 
c    b[49][10][2] = 16811 b[49][10][1] = 16812 b[49][10][0] = 16813 
c    b[49][11][2] = 16814 b[49][11][1] = 16815 b[49][11][0] = 16816 
c    b[49][12][2] = 16817 b[49][12][1] = 16818 b[49][12][0] = 16819 
c    b[49][13][2] = 16820 b[49][13][1] = 16821 b[49][13][0] = 16822 
c    b[49][14][2] = 16823 b[49][14][1] = 16824 b[49][14][0] = 16825 
c    b[49][15][2] = 16826 b[49][15][1] = 16827 b[49][15][0] = 16828 
c    b[49][16][2] = 16829 b[49][16][1] = 16830 b[49][16][0] = 16831 
c    b[49][17][2] = 16832 b[49][17][1] = 16833 b[49][17][0] = 16834 
c    b[49][18][2] = 16835 b[49][18][1] = 16836 b[49][18][0] = 16837 
c    b[49][19][2] = 16838 b[49][19][1] = 16839 b[49][19][0] = 16840 
c    b[49][20][2] = 16841 b[49][20][1] = 16842 b[49][20][0] = 16843 
c    b[49][21][2] = 16844 b[49][21][1] = 16845 b[49][21][0] = 16846 
c    b[49][22][2] = 16847 b[49][22][1] = 16848 b[49][22][0] = 16849 
c    b[49][23][2] = 16850 b[49][23][1] = 16851 b[49][23][0] = 16852 
c    b[49][24][2] = 16853 b[49][24][1] = 16854 b[49][24][0] = 16855 

c    b[50][1][2] = 16856 b[50][1][1] = 16857 b[50][1][0] = 16858 
c    b[50][2][2] = 16859 b[50][2][1] = 16860 b[50][2][0] = 16861 
c    b[50][3][2] = 16862 b[50][3][1] = 16863 b[50][3][0] = 16864 
c    b[50][4][2] = 16865 b[50][4][1] = 16866 b[50][4][0] = 16867 
c    b[50][5][2] = 16868 b[50][5][1] = 16869 b[50][5][0] = 16870 
c    b[50][6][2] = 16871 b[50][6][1] = 16872 b[50][6][0] = 16873 
c    b[50][7][2] = 16874 b[50][7][1] = 16875 b[50][7][0] = 16876 
c    b[50][8][2] = 16877 b[50][8][1] = 16878 b[50][8][0] = 16879 
c    b[50][9][2] = 16880 b[50][9][1] = 16881 b[50][9][0] = 16882 
c    b[50][10][2] = 16883 b[50][10][1] = 16884 b[50][10][0] = 16885 
c    b[50][11][2] = 16886 b[50][11][1] = 16887 b[50][11][0] = 16888 
c    b[50][12][2] = 16889 b[50][12][1] = 16890 b[50][12][0] = 16891 
c    b[50][13][2] = 16892 b[50][13][1] = 16893 b[50][13][0] = 16894 
c    b[50][14][2] = 16895 b[50][14][1] = 16896 b[50][14][0] = 16897 
c    b[50][15][2] = 16898 b[50][15][1] = 16899 b[50][15][0] = 16900 
c    b[50][16][2] = 16901 b[50][16][1] = 16902 b[50][16][0] = 16903 
c    b[50][17][2] = 16904 b[50][17][1] = 16905 b[50][17][0] = 16906 
c    b[50][18][2] = 16907 b[50][18][1] = 16908 b[50][18][0] = 16909 
c    b[50][19][2] = 16910 b[50][19][1] = 16911 b[50][19][0] = 16912 
c    b[50][20][2] = 16913 b[50][20][1] = 16914 b[50][20][0] = 16915 
c    b[50][21][2] = 16916 b[50][21][1] = 16917 b[50][21][0] = 16918 
c    b[50][22][2] = 16919 b[50][22][1] = 16920 b[50][22][0] = 16921 
c    b[50][23][2] = 16922 b[50][23][1] = 16923 b[50][23][0] = 16924 
c    b[50][24][2] = 16925 b[50][24][1] = 16926 b[50][24][0] = 16927 

c    b[51][1][2] = 16928 b[51][1][1] = 16929 b[51][1][0] = 16930 
c    b[51][2][2] = 16931 b[51][2][1] = 16932 b[51][2][0] = 16933 
c    b[51][3][2] = 16934 b[51][3][1] = 16935 b[51][3][0] = 16936 
c    b[51][4][2] = 16937 b[51][4][1] = 16938 b[51][4][0] = 16939 
c    b[51][5][2] = 16940 b[51][5][1] = 16941 b[51][5][0] = 16942 
c    b[51][6][2] = 16943 b[51][6][1] = 16944 b[51][6][0] = 16945 
c    b[51][7][2] = 16946 b[51][7][1] = 16947 b[51][7][0] = 16948 
c    b[51][8][2] = 16949 b[51][8][1] = 16950 b[51][8][0] = 16951 
c    b[51][9][2] = 16952 b[51][9][1] = 16953 b[51][9][0] = 16954 
c    b[51][10][2] = 16955 b[51][10][1] = 16956 b[51][10][0] = 16957 
c    b[51][11][2] = 16958 b[51][11][1] = 16959 b[51][11][0] = 16960 
c    b[51][12][2] = 16961 b[51][12][1] = 16962 b[51][12][0] = 16963 
c    b[51][13][2] = 16964 b[51][13][1] = 16965 b[51][13][0] = 16966 
c    b[51][14][2] = 16967 b[51][14][1] = 16968 b[51][14][0] = 16969 
c    b[51][15][2] = 16970 b[51][15][1] = 16971 b[51][15][0] = 16972 
c    b[51][16][2] = 16973 b[51][16][1] = 16974 b[51][16][0] = 16975 
c    b[51][17][2] = 16976 b[51][17][1] = 16977 b[51][17][0] = 16978 
c    b[51][18][2] = 16979 b[51][18][1] = 16980 b[51][18][0] = 16981 
c    b[51][19][2] = 16982 b[51][19][1] = 16983 b[51][19][0] = 16984 
c    b[51][20][2] = 16985 b[51][20][1] = 16986 b[51][20][0] = 16987 
c    b[51][21][2] = 16988 b[51][21][1] = 16989 b[51][21][0] = 16990 
c    b[51][22][2] = 16991 b[51][22][1] = 16992 b[51][22][0] = 16993 
c    b[51][23][2] = 16994 b[51][23][1] = 16995 b[51][23][0] = 16996 

c    b[52][1][2] = 16997 b[52][1][1] = 16998 b[52][1][0] = 16999 
c    b[52][2][2] = 17000 b[52][2][1] = 17001 b[52][2][0] = 17002 
c    b[52][3][2] = 17003 b[52][3][1] = 17004 b[52][3][0] = 17005 
c    b[52][4][2] = 17006 b[52][4][1] = 17007 b[52][4][0] = 17008 
c    b[52][5][2] = 17009 b[52][5][1] = 17010 b[52][5][0] = 17011 
c    b[52][6][2] = 17012 b[52][6][1] = 17013 b[52][6][0] = 17014 
c    b[52][7][2] = 17015 b[52][7][1] = 17016 b[52][7][0] = 17017 
c    b[52][8][2] = 17018 b[52][8][1] = 17019 b[52][8][0] = 17020 
c    b[52][9][2] = 17021 b[52][9][1] = 17022 b[52][9][0] = 17023 
c    b[52][10][2] = 17024 b[52][10][1] = 17025 b[52][10][0] = 17026 
c    b[52][11][2] = 17027 b[52][11][1] = 17028 b[52][11][0] = 17029 
c    b[52][12][2] = 17030 b[52][12][1] = 17031 b[52][12][0] = 17032 
c    b[52][13][2] = 17033 b[52][13][1] = 17034 b[52][13][0] = 17035 
c    b[52][14][2] = 17036 b[52][14][1] = 17037 b[52][14][0] = 17038 
c    b[52][15][2] = 17039 b[52][15][1] = 17040 b[52][15][0] = 17041 
c    b[52][16][2] = 17042 b[52][16][1] = 17043 b[52][16][0] = 17044 
c    b[52][17][2] = 17045 b[52][17][1] = 17046 b[52][17][0] = 17047 
c    b[52][18][2] = 17048 b[52][18][1] = 17049 b[52][18][0] = 17050 
c    b[52][19][2] = 17051 b[52][19][1] = 17052 b[52][19][0] = 17053 
c    b[52][20][2] = 17054 b[52][20][1] = 17055 b[52][20][0] = 17056 
c    b[52][21][2] = 17057 b[52][21][1] = 17058 b[52][21][0] = 17059 
c    b[52][22][2] = 17060 b[52][22][1] = 17061 b[52][22][0] = 17062 
c    b[52][23][2] = 17063 b[52][23][1] = 17064 b[52][23][0] = 17065 

c    b[53][1][2] = 17066 b[53][1][1] = 17067 b[53][1][0] = 17068 
c    b[53][2][2] = 17069 b[53][2][1] = 17070 b[53][2][0] = 17071 
c    b[53][3][2] = 17072 b[53][3][1] = 17073 b[53][3][0] = 17074 
c    b[53][4][2] = 17075 b[53][4][1] = 17076 b[53][4][0] = 17077 
c    b[53][5][2] = 17078 b[53][5][1] = 17079 b[53][5][0] = 17080 
c    b[53][6][2] = 17081 b[53][6][1] = 17082 b[53][6][0] = 17083 
c    b[53][7][2] = 17084 b[53][7][1] = 17085 b[53][7][0] = 17086 
c    b[53][8][2] = 17087 b[53][8][1] = 17088 b[53][8][0] = 17089 
c    b[53][9][2] = 17090 b[53][9][1] = 17091 b[53][9][0] = 17092 
c    b[53][10][2] = 17093 b[53][10][1] = 17094 b[53][10][0] = 17095 
c    b[53][11][2] = 17096 b[53][11][1] = 17097 b[53][11][0] = 17098 
c    b[53][12][2] = 17099 b[53][12][1] = 17100 b[53][12][0] = 17101 
c    b[53][13][2] = 17102 b[53][13][1] = 17103 b[53][13][0] = 17104 
c    b[53][14][2] = 17105 b[53][14][1] = 17106 b[53][14][0] = 17107 
c    b[53][15][2] = 17108 b[53][15][1] = 17109 b[53][15][0] = 17110 
c    b[53][16][2] = 17111 b[53][16][1] = 17112 b[53][16][0] = 17113 
c    b[53][17][2] = 17114 b[53][17][1] = 17115 b[53][17][0] = 17116 
c    b[53][18][2] = 17117 b[53][18][1] = 17118 b[53][18][0] = 17119 
c    b[53][19][2] = 17120 b[53][19][1] = 17121 b[53][19][0] = 17122 
c    b[53][20][2] = 17123 b[53][20][1] = 17124 b[53][20][0] = 17125 
c    b[53][21][2] = 17126 b[53][21][1] = 17127 b[53][21][0] = 17128 
c    b[53][22][2] = 17129 b[53][22][1] = 17130 b[53][22][0] = 17131 

c    b[54][1][2] = 17132 b[54][1][1] = 17133 b[54][1][0] = 17134 
c    b[54][2][2] = 17135 b[54][2][1] = 17136 b[54][2][0] = 17137 
c    b[54][3][2] = 17138 b[54][3][1] = 17139 b[54][3][0] = 17140 
c    b[54][4][2] = 17141 b[54][4][1] = 17142 b[54][4][0] = 17143 
c    b[54][5][2] = 17144 b[54][5][1] = 17145 b[54][5][0] = 17146 
c    b[54][6][2] = 17147 b[54][6][1] = 17148 b[54][6][0] = 17149 
c    b[54][7][2] = 17150 b[54][7][1] = 17151 b[54][7][0] = 17152 
c    b[54][8][2] = 17153 b[54][8][1] = 17154 b[54][8][0] = 17155 
c    b[54][9][2] = 17156 b[54][9][1] = 17157 b[54][9][0] = 17158 
c    b[54][10][2] = 17159 b[54][10][1] = 17160 b[54][10][0] = 17161 
c    b[54][11][2] = 17162 b[54][11][1] = 17163 b[54][11][0] = 17164 
c    b[54][12][2] = 17165 b[54][12][1] = 17166 b[54][12][0] = 17167 
c    b[54][13][2] = 17168 b[54][13][1] = 17169 b[54][13][0] = 17170 
c    b[54][14][2] = 17171 b[54][14][1] = 17172 b[54][14][0] = 17173 
c    b[54][15][2] = 17174 b[54][15][1] = 17175 b[54][15][0] = 17176 
c    b[54][16][2] = 17177 b[54][16][1] = 17178 b[54][16][0] = 17179 
c    b[54][17][2] = 17180 b[54][17][1] = 17181 b[54][17][0] = 17182 
c    b[54][18][2] = 17183 b[54][18][1] = 17184 b[54][18][0] = 17185 
c    b[54][19][2] = 17186 b[54][19][1] = 17187 b[54][19][0] = 17188 
c    b[54][20][2] = 17189 b[54][20][1] = 17190 b[54][20][0] = 17191 
c    b[54][21][2] = 17192 b[54][21][1] = 17193 b[54][21][0] = 17194 
c    b[54][22][2] = 17195 b[54][22][1] = 17196 b[54][22][0] = 17197 

c    b[55][1][2] = 17198 b[55][1][1] = 17199 b[55][1][0] = 17200 
c    b[55][2][2] = 17201 b[55][2][1] = 17202 b[55][2][0] = 17203 
c    b[55][3][2] = 17204 b[55][3][1] = 17205 b[55][3][0] = 17206 
c    b[55][4][2] = 17207 b[55][4][1] = 17208 b[55][4][0] = 17209 
c    b[55][5][2] = 17210 b[55][5][1] = 17211 b[55][5][0] = 17212 
c    b[55][6][2] = 17213 b[55][6][1] = 17214 b[55][6][0] = 17215 
c    b[55][7][2] = 17216 b[55][7][1] = 17217 b[55][7][0] = 17218 
c    b[55][8][2] = 17219 b[55][8][1] = 17220 b[55][8][0] = 17221 
c    b[55][9][2] = 17222 b[55][9][1] = 17223 b[55][9][0] = 17224 
c    b[55][10][2] = 17225 b[55][10][1] = 17226 b[55][10][0] = 17227 
c    b[55][11][2] = 17228 b[55][11][1] = 17229 b[55][11][0] = 17230 
c    b[55][12][2] = 17231 b[55][12][1] = 17232 b[55][12][0] = 17233 
c    b[55][13][2] = 17234 b[55][13][1] = 17235 b[55][13][0] = 17236 
c    b[55][14][2] = 17237 b[55][14][1] = 17238 b[55][14][0] = 17239 
c    b[55][15][2] = 17240 b[55][15][1] = 17241 b[55][15][0] = 17242 
c    b[55][16][2] = 17243 b[55][16][1] = 17244 b[55][16][0] = 17245 
c    b[55][17][2] = 17246 b[55][17][1] = 17247 b[55][17][0] = 17248 
c    b[55][18][2] = 17249 b[55][18][1] = 17250 b[55][18][0] = 17251 
c    b[55][19][2] = 17252 b[55][19][1] = 17253 b[55][19][0] = 17254 
c    b[55][20][2] = 17255 b[55][20][1] = 17256 b[55][20][0] = 17257 
c    b[55][21][2] = 17258 b[55][21][1] = 17259 b[55][21][0] = 17260 
c    b[55][22][2] = 17261 b[55][22][1] = 17262 b[55][22][0] = 17263 

c    b[56][1][2] = 17264 b[56][1][1] = 17265 b[56][1][0] = 17266 
c    b[56][2][2] = 17267 b[56][2][1] = 17268 b[56][2][0] = 17269 
c    b[56][3][2] = 17270 b[56][3][1] = 17271 b[56][3][0] = 17272 
c    b[56][4][2] = 17273 b[56][4][1] = 17274 b[56][4][0] = 17275 
c    b[56][5][2] = 17276 b[56][5][1] = 17277 b[56][5][0] = 17278 
c    b[56][6][2] = 17279 b[56][6][1] = 17280 b[56][6][0] = 17281 
c    b[56][7][2] = 17282 b[56][7][1] = 17283 b[56][7][0] = 17284 
c    b[56][8][2] = 17285 b[56][8][1] = 17286 b[56][8][0] = 17287 
c    b[56][9][2] = 17288 b[56][9][1] = 17289 b[56][9][0] = 17290 
c    b[56][10][2] = 17291 b[56][10][1] = 17292 b[56][10][0] = 17293 
c    b[56][11][2] = 17294 b[56][11][1] = 17295 b[56][11][0] = 17296 
c    b[56][12][2] = 17297 b[56][12][1] = 17298 b[56][12][0] = 17299 
c    b[56][13][2] = 17300 b[56][13][1] = 17301 b[56][13][0] = 17302 
c    b[56][14][2] = 17303 b[56][14][1] = 17304 b[56][14][0] = 17305 
c    b[56][15][2] = 17306 b[56][15][1] = 17307 b[56][15][0] = 17308 
c    b[56][16][2] = 17309 b[56][16][1] = 17310 b[56][16][0] = 17311 
c    b[56][17][2] = 17312 b[56][17][1] = 17313 b[56][17][0] = 17314 
c    b[56][18][2] = 17315 b[56][18][1] = 17316 b[56][18][0] = 17317 
c    b[56][19][2] = 17318 b[56][19][1] = 17319 b[56][19][0] = 17320 
c    b[56][20][2] = 17321 b[56][20][1] = 17322 b[56][20][0] = 17323 
c    b[56][21][2] = 17324 b[56][21][1] = 17325 b[56][21][0] = 17326 

c    b[57][1][2] = 17327 b[57][1][1] = 17328 b[57][1][0] = 17329 
c    b[57][2][2] = 17330 b[57][2][1] = 17331 b[57][2][0] = 17332 
c    b[57][3][2] = 17333 b[57][3][1] = 17334 b[57][3][0] = 17335 
c    b[57][4][2] = 17336 b[57][4][1] = 17337 b[57][4][0] = 17338 
c    b[57][5][2] = 17339 b[57][5][1] = 17340 b[57][5][0] = 17341 
c    b[57][6][2] = 17342 b[57][6][1] = 17343 b[57][6][0] = 17344 
c    b[57][7][2] = 17345 b[57][7][1] = 17346 b[57][7][0] = 17347 
c    b[57][8][2] = 17348 b[57][8][1] = 17349 b[57][8][0] = 17350 
c    b[57][9][2] = 17351 b[57][9][1] = 17352 b[57][9][0] = 17353 
c    b[57][10][2] = 17354 b[57][10][1] = 17355 b[57][10][0] = 17356 
c    b[57][11][2] = 17357 b[57][11][1] = 17358 b[57][11][0] = 17359 
c    b[57][12][2] = 17360 b[57][12][1] = 17361 b[57][12][0] = 17362 
c    b[57][13][2] = 17363 b[57][13][1] = 17364 b[57][13][0] = 17365 
c    b[57][14][2] = 17366 b[57][14][1] = 17367 b[57][14][0] = 17368 
c    b[57][15][2] = 17369 b[57][15][1] = 17370 b[57][15][0] = 17371 
c    b[57][16][2] = 17372 b[57][16][1] = 17373 b[57][16][0] = 17374 
c    b[57][17][2] = 17375 b[57][17][1] = 17376 b[57][17][0] = 17377 
c    b[57][18][2] = 17378 b[57][18][1] = 17379 b[57][18][0] = 17380 
c    b[57][19][2] = 17381 b[57][19][1] = 17382 b[57][19][0] = 17383 
c    b[57][20][2] = 17384 b[57][20][1] = 17385 b[57][20][0] = 17386 
c    b[57][21][2] = 17387 b[57][21][1] = 17388 b[57][21][0] = 17389 

c    b[58][1][2] = 17390 b[58][1][1] = 17391 b[58][1][0] = 17392 
c    b[58][2][2] = 17393 b[58][2][1] = 17394 b[58][2][0] = 17395 
c    b[58][3][2] = 17396 b[58][3][1] = 17397 b[58][3][0] = 17398 
c    b[58][4][2] = 17399 b[58][4][1] = 17400 b[58][4][0] = 17401 
c    b[58][5][2] = 17402 b[58][5][1] = 17403 b[58][5][0] = 17404 
c    b[58][6][2] = 17405 b[58][6][1] = 17406 b[58][6][0] = 17407 
c    b[58][7][2] = 17408 b[58][7][1] = 17409 b[58][7][0] = 17410 
c    b[58][8][2] = 17411 b[58][8][1] = 17412 b[58][8][0] = 17413 
c    b[58][9][2] = 17414 b[58][9][1] = 17415 b[58][9][0] = 17416 
c    b[58][10][2] = 17417 b[58][10][1] = 17418 b[58][10][0] = 17419 
c    b[58][11][2] = 17420 b[58][11][1] = 17421 b[58][11][0] = 17422 
c    b[58][12][2] = 17423 b[58][12][1] = 17424 b[58][12][0] = 17425 
c    b[58][13][2] = 17426 b[58][13][1] = 17427 b[58][13][0] = 17428 
c    b[58][14][2] = 17429 b[58][14][1] = 17430 b[58][14][0] = 17431 
c    b[58][15][2] = 17432 b[58][15][1] = 17433 b[58][15][0] = 17434 
c    b[58][16][2] = 17435 b[58][16][1] = 17436 b[58][16][0] = 17437 
c    b[58][17][2] = 17438 b[58][17][1] = 17439 b[58][17][0] = 17440 
c    b[58][18][2] = 17441 b[58][18][1] = 17442 b[58][18][0] = 17443 
c    b[58][19][2] = 17444 b[58][19][1] = 17445 b[58][19][0] = 17446 
c    b[58][20][2] = 17447 b[58][20][1] = 17448 b[58][20][0] = 17449 
c    b[58][21][2] = 17450 b[58][21][1] = 17451 b[58][21][0] = 17452 

c    b[59][1][2] = 17453 b[59][1][1] = 17454 b[59][1][0] = 17455 
c    b[59][2][2] = 17456 b[59][2][1] = 17457 b[59][2][0] = 17458 
c    b[59][3][2] = 17459 b[59][3][1] = 17460 b[59][3][0] = 17461 
c    b[59][4][2] = 17462 b[59][4][1] = 17463 b[59][4][0] = 17464 
c    b[59][5][2] = 17465 b[59][5][1] = 17466 b[59][5][0] = 17467 
c    b[59][6][2] = 17468 b[59][6][1] = 17469 b[59][6][0] = 17470 
c    b[59][7][2] = 17471 b[59][7][1] = 17472 b[59][7][0] = 17473 
c    b[59][8][2] = 17474 b[59][8][1] = 17475 b[59][8][0] = 17476 
c    b[59][9][2] = 17477 b[59][9][1] = 17478 b[59][9][0] = 17479 
c    b[59][10][2] = 17480 b[59][10][1] = 17481 b[59][10][0] = 17482 
c    b[59][11][2] = 17483 b[59][11][1] = 17484 b[59][11][0] = 17485 
c    b[59][12][2] = 17486 b[59][12][1] = 17487 b[59][12][0] = 17488 
c    b[59][13][2] = 17489 b[59][13][1] = 17490 b[59][13][0] = 17491 
c    b[59][14][2] = 17492 b[59][14][1] = 17493 b[59][14][0] = 17494 
c    b[59][15][2] = 17495 b[59][15][1] = 17496 b[59][15][0] = 17497 
c    b[59][16][2] = 17498 b[59][16][1] = 17499 b[59][16][0] = 17500 
c    b[59][17][2] = 17501 b[59][17][1] = 17502 b[59][17][0] = 17503 
c    b[59][18][2] = 17504 b[59][18][1] = 17505 b[59][18][0] = 17506 
c    b[59][19][2] = 17507 b[59][19][1] = 17508 b[59][19][0] = 17509 
c    b[59][20][2] = 17510 b[59][20][1] = 17511 b[59][20][0] = 17512 

c    b[60][1][2] = 17513 b[60][1][1] = 17514 b[60][1][0] = 17515 
c    b[60][2][2] = 17516 b[60][2][1] = 17517 b[60][2][0] = 17518 
c    b[60][3][2] = 17519 b[60][3][1] = 17520 b[60][3][0] = 17521 
c    b[60][4][2] = 17522 b[60][4][1] = 17523 b[60][4][0] = 17524 
c    b[60][5][2] = 17525 b[60][5][1] = 17526 b[60][5][0] = 17527 
c    b[60][6][2] = 17528 b[60][6][1] = 17529 b[60][6][0] = 17530 
c    b[60][7][2] = 17531 b[60][7][1] = 17532 b[60][7][0] = 17533 
c    b[60][8][2] = 17534 b[60][8][1] = 17535 b[60][8][0] = 17536 
c    b[60][9][2] = 17537 b[60][9][1] = 17538 b[60][9][0] = 17539 
c    b[60][10][2] = 17540 b[60][10][1] = 17541 b[60][10][0] = 17542 
c    b[60][11][2] = 17543 b[60][11][1] = 17544 b[60][11][0] = 17545 
c    b[60][12][2] = 17546 b[60][12][1] = 17547 b[60][12][0] = 17548 
c    b[60][13][2] = 17549 b[60][13][1] = 17550 b[60][13][0] = 17551 
c    b[60][14][2] = 17552 b[60][14][1] = 17553 b[60][14][0] = 17554 
c    b[60][15][2] = 17555 b[60][15][1] = 17556 b[60][15][0] = 17557 
c    b[60][16][2] = 17558 b[60][16][1] = 17559 b[60][16][0] = 17560 
c    b[60][17][2] = 17561 b[60][17][1] = 17562 b[60][17][0] = 17563 
c    b[60][18][2] = 17564 b[60][18][1] = 17565 b[60][18][0] = 17566 
c    b[60][19][2] = 17567 b[60][19][1] = 17568 b[60][19][0] = 17569 
c    b[60][20][2] = 17570 b[60][20][1] = 17571 b[60][20][0] = 17572 

c    b[61][1][2] = 17573 b[61][1][1] = 17574 b[61][1][0] = 17575 
c    b[61][2][2] = 17576 b[61][2][1] = 17577 b[61][2][0] = 17578 
c    b[61][3][2] = 17579 b[61][3][1] = 17580 b[61][3][0] = 17581 
c    b[61][4][2] = 17582 b[61][4][1] = 17583 b[61][4][0] = 17584 
c    b[61][5][2] = 17585 b[61][5][1] = 17586 b[61][5][0] = 17587 
c    b[61][6][2] = 17588 b[61][6][1] = 17589 b[61][6][0] = 17590 
c    b[61][7][2] = 17591 b[61][7][1] = 17592 b[61][7][0] = 17593 
c    b[61][8][2] = 17594 b[61][8][1] = 17595 b[61][8][0] = 17596 
c    b[61][9][2] = 17597 b[61][9][1] = 17598 b[61][9][0] = 17599 
c    b[61][10][2] = 17600 b[61][10][1] = 17601 b[61][10][0] = 17602 
c    b[61][11][2] = 17603 b[61][11][1] = 17604 b[61][11][0] = 17605 
c    b[61][12][2] = 17606 b[61][12][1] = 17607 b[61][12][0] = 17608 
c    b[61][13][2] = 17609 b[61][13][1] = 17610 b[61][13][0] = 17611 
c    b[61][14][2] = 17612 b[61][14][1] = 17613 b[61][14][0] = 17614 
c    b[61][15][2] = 17615 b[61][15][1] = 17616 b[61][15][0] = 17617 
c    b[61][16][2] = 17618 b[61][16][1] = 17619 b[61][16][0] = 17620 
c    b[61][17][2] = 17621 b[61][17][1] = 17622 b[61][17][0] = 17623 
c    b[61][18][2] = 17624 b[61][18][1] = 17625 b[61][18][0] = 17626 
c    b[61][19][2] = 17627 b[61][19][1] = 17628 b[61][19][0] = 17629 
c    b[61][20][2] = 17630 b[61][20][1] = 17631 b[61][20][0] = 17632 

c    b[62][1][2] = 17633 b[62][1][1] = 17634 b[62][1][0] = 17635 
c    b[62][2][2] = 17636 b[62][2][1] = 17637 b[62][2][0] = 17638 
c    b[62][3][2] = 17639 b[62][3][1] = 17640 b[62][3][0] = 17641 
c    b[62][4][2] = 17642 b[62][4][1] = 17643 b[62][4][0] = 17644 
c    b[62][5][2] = 17645 b[62][5][1] = 17646 b[62][5][0] = 17647 
c    b[62][6][2] = 17648 b[62][6][1] = 17649 b[62][6][0] = 17650 
c    b[62][7][2] = 17651 b[62][7][1] = 17652 b[62][7][0] = 17653 
c    b[62][8][2] = 17654 b[62][8][1] = 17655 b[62][8][0] = 17656 
c    b[62][9][2] = 17657 b[62][9][1] = 17658 b[62][9][0] = 17659 
c    b[62][10][2] = 17660 b[62][10][1] = 17661 b[62][10][0] = 17662 
c    b[62][11][2] = 17663 b[62][11][1] = 17664 b[62][11][0] = 17665 
c    b[62][12][2] = 17666 b[62][12][1] = 17667 b[62][12][0] = 17668 
c    b[62][13][2] = 17669 b[62][13][1] = 17670 b[62][13][0] = 17671 
c    b[62][14][2] = 17672 b[62][14][1] = 17673 b[62][14][0] = 17674 
c    b[62][15][2] = 17675 b[62][15][1] = 17676 b[62][15][0] = 17677 
c    b[62][16][2] = 17678 b[62][16][1] = 17679 b[62][16][0] = 17680 
c    b[62][17][2] = 17681 b[62][17][1] = 17682 b[62][17][0] = 17683 
c    b[62][18][2] = 17684 b[62][18][1] = 17685 b[62][18][0] = 17686 
c    b[62][19][2] = 17687 b[62][19][1] = 17688 b[62][19][0] = 17689 

c    b[63][1][2] = 17690 b[63][1][1] = 17691 b[63][1][0] = 17692 
c    b[63][2][2] = 17693 b[63][2][1] = 17694 b[63][2][0] = 17695 
c    b[63][3][2] = 17696 b[63][3][1] = 17697 b[63][3][0] = 17698 
c    b[63][4][2] = 17699 b[63][4][1] = 17700 b[63][4][0] = 17701 
c    b[63][5][2] = 17702 b[63][5][1] = 17703 b[63][5][0] = 17704 
c    b[63][6][2] = 17705 b[63][6][1] = 17706 b[63][6][0] = 17707 
c    b[63][7][2] = 17708 b[63][7][1] = 17709 b[63][7][0] = 17710 
c    b[63][8][2] = 17711 b[63][8][1] = 17712 b[63][8][0] = 17713 
c    b[63][9][2] = 17714 b[63][9][1] = 17715 b[63][9][0] = 17716 
c    b[63][10][2] = 17717 b[63][10][1] = 17718 b[63][10][0] = 17719 
c    b[63][11][2] = 17720 b[63][11][1] = 17721 b[63][11][0] = 17722 
c    b[63][12][2] = 17723 b[63][12][1] = 17724 b[63][12][0] = 17725 
c    b[63][13][2] = 17726 b[63][13][1] = 17727 b[63][13][0] = 17728 
c    b[63][14][2] = 17729 b[63][14][1] = 17730 b[63][14][0] = 17731 
c    b[63][15][2] = 17732 b[63][15][1] = 17733 b[63][15][0] = 17734 
c    b[63][16][2] = 17735 b[63][16][1] = 17736 b[63][16][0] = 17737 
c    b[63][17][2] = 17738 b[63][17][1] = 17739 b[63][17][0] = 17740 
c    b[63][18][2] = 17741 b[63][18][1] = 17742 b[63][18][0] = 17743 
c    b[63][19][2] = 17744 b[63][19][1] = 17745 b[63][19][0] = 17746 

c    b[64][1][2] = 17747 b[64][1][1] = 17748 b[64][1][0] = 17749 
c    b[64][2][2] = 17750 b[64][2][1] = 17751 b[64][2][0] = 17752 
c    b[64][3][2] = 17753 b[64][3][1] = 17754 b[64][3][0] = 17755 
c    b[64][4][2] = 17756 b[64][4][1] = 17757 b[64][4][0] = 17758 
c    b[64][5][2] = 17759 b[64][5][1] = 17760 b[64][5][0] = 17761 
c    b[64][6][2] = 17762 b[64][6][1] = 17763 b[64][6][0] = 17764 
c    b[64][7][2] = 17765 b[64][7][1] = 17766 b[64][7][0] = 17767 
c    b[64][8][2] = 17768 b[64][8][1] = 17769 b[64][8][0] = 17770 
c    b[64][9][2] = 17771 b[64][9][1] = 17772 b[64][9][0] = 17773 
c    b[64][10][2] = 17774 b[64][10][1] = 17775 b[64][10][0] = 17776 
c    b[64][11][2] = 17777 b[64][11][1] = 17778 b[64][11][0] = 17779 
c    b[64][12][2] = 17780 b[64][12][1] = 17781 b[64][12][0] = 17782 
c    b[64][13][2] = 17783 b[64][13][1] = 17784 b[64][13][0] = 17785 
c    b[64][14][2] = 17786 b[64][14][1] = 17787 b[64][14][0] = 17788 
c    b[64][15][2] = 17789 b[64][15][1] = 17790 b[64][15][0] = 17791 
c    b[64][16][2] = 17792 b[64][16][1] = 17793 b[64][16][0] = 17794 
c    b[64][17][2] = 17795 b[64][17][1] = 17796 b[64][17][0] = 17797 
c    b[64][18][2] = 17798 b[64][18][1] = 17799 b[64][18][0] = 17800 
c    b[64][19][2] = 17801 b[64][19][1] = 17802 b[64][19][0] = 17803 

c    b[65][1][2] = 17804 b[65][1][1] = 17805 b[65][1][0] = 17806 
c    b[65][2][2] = 17807 b[65][2][1] = 17808 b[65][2][0] = 17809 
c    b[65][3][2] = 17810 b[65][3][1] = 17811 b[65][3][0] = 17812 
c    b[65][4][2] = 17813 b[65][4][1] = 17814 b[65][4][0] = 17815 
c    b[65][5][2] = 17816 b[65][5][1] = 17817 b[65][5][0] = 17818 
c    b[65][6][2] = 17819 b[65][6][1] = 17820 b[65][6][0] = 17821 
c    b[65][7][2] = 17822 b[65][7][1] = 17823 b[65][7][0] = 17824 
c    b[65][8][2] = 17825 b[65][8][1] = 17826 b[65][8][0] = 17827 
c    b[65][9][2] = 17828 b[65][9][1] = 17829 b[65][9][0] = 17830 
c    b[65][10][2] = 17831 b[65][10][1] = 17832 b[65][10][0] = 17833 
c    b[65][11][2] = 17834 b[65][11][1] = 17835 b[65][11][0] = 17836 
c    b[65][12][2] = 17837 b[65][12][1] = 17838 b[65][12][0] = 17839 
c    b[65][13][2] = 17840 b[65][13][1] = 17841 b[65][13][0] = 17842 
c    b[65][14][2] = 17843 b[65][14][1] = 17844 b[65][14][0] = 17845 
c    b[65][15][2] = 17846 b[65][15][1] = 17847 b[65][15][0] = 17848 
c    b[65][16][2] = 17849 b[65][16][1] = 17850 b[65][16][0] = 17851 
c    b[65][17][2] = 17852 b[65][17][1] = 17853 b[65][17][0] = 17854 
c    b[65][18][2] = 17855 b[65][18][1] = 17856 b[65][18][0] = 17857 

c    b[66][1][2] = 17858 b[66][1][1] = 17859 b[66][1][0] = 17860 
c    b[66][2][2] = 17861 b[66][2][1] = 17862 b[66][2][0] = 17863 
c    b[66][3][2] = 17864 b[66][3][1] = 17865 b[66][3][0] = 17866 
c    b[66][4][2] = 17867 b[66][4][1] = 17868 b[66][4][0] = 17869 
c    b[66][5][2] = 17870 b[66][5][1] = 17871 b[66][5][0] = 17872 
c    b[66][6][2] = 17873 b[66][6][1] = 17874 b[66][6][0] = 17875 
c    b[66][7][2] = 17876 b[66][7][1] = 17877 b[66][7][0] = 17878 
c    b[66][8][2] = 17879 b[66][8][1] = 17880 b[66][8][0] = 17881 
c    b[66][9][2] = 17882 b[66][9][1] = 17883 b[66][9][0] = 17884 
c    b[66][10][2] = 17885 b[66][10][1] = 17886 b[66][10][0] = 17887 
c    b[66][11][2] = 17888 b[66][11][1] = 17889 b[66][11][0] = 17890 
c    b[66][12][2] = 17891 b[66][12][1] = 17892 b[66][12][0] = 17893 
c    b[66][13][2] = 17894 b[66][13][1] = 17895 b[66][13][0] = 17896 
c    b[66][14][2] = 17897 b[66][14][1] = 17898 b[66][14][0] = 17899 
c    b[66][15][2] = 17900 b[66][15][1] = 17901 b[66][15][0] = 17902 
c    b[66][16][2] = 17903 b[66][16][1] = 17904 b[66][16][0] = 17905 
c    b[66][17][2] = 17906 b[66][17][1] = 17907 b[66][17][0] = 17908 
c    b[66][18][2] = 17909 b[66][18][1] = 17910 b[66][18][0] = 17911 

c    b[67][1][2] = 17912 b[67][1][1] = 17913 b[67][1][0] = 17914 
c    b[67][2][2] = 17915 b[67][2][1] = 17916 b[67][2][0] = 17917 
c    b[67][3][2] = 17918 b[67][3][1] = 17919 b[67][3][0] = 17920 
c    b[67][4][2] = 17921 b[67][4][1] = 17922 b[67][4][0] = 17923 
c    b[67][5][2] = 17924 b[67][5][1] = 17925 b[67][5][0] = 17926 
c    b[67][6][2] = 17927 b[67][6][1] = 17928 b[67][6][0] = 17929 
c    b[67][7][2] = 17930 b[67][7][1] = 17931 b[67][7][0] = 17932 
c    b[67][8][2] = 17933 b[67][8][1] = 17934 b[67][8][0] = 17935 
c    b[67][9][2] = 17936 b[67][9][1] = 17937 b[67][9][0] = 17938 
c    b[67][10][2] = 17939 b[67][10][1] = 17940 b[67][10][0] = 17941 
c    b[67][11][2] = 17942 b[67][11][1] = 17943 b[67][11][0] = 17944 
c    b[67][12][2] = 17945 b[67][12][1] = 17946 b[67][12][0] = 17947 
c    b[67][13][2] = 17948 b[67][13][1] = 17949 b[67][13][0] = 17950 
c    b[67][14][2] = 17951 b[67][14][1] = 17952 b[67][14][0] = 17953 
c    b[67][15][2] = 17954 b[67][15][1] = 17955 b[67][15][0] = 17956 
c    b[67][16][2] = 17957 b[67][16][1] = 17958 b[67][16][0] = 17959 
c    b[67][17][2] = 17960 b[67][17][1] = 17961 b[67][17][0] = 17962 
c    b[67][18][2] = 17963 b[67][18][1] = 17964 b[67][18][0] = 17965 

c    b[68][1][2] = 17966 b[68][1][1] = 17967 b[68][1][0] = 17968 
c    b[68][2][2] = 17969 b[68][2][1] = 17970 b[68][2][0] = 17971 
c    b[68][3][2] = 17972 b[68][3][1] = 17973 b[68][3][0] = 17974 
c    b[68][4][2] = 17975 b[68][4][1] = 17976 b[68][4][0] = 17977 
c    b[68][5][2] = 17978 b[68][5][1] = 17979 b[68][5][0] = 17980 
c    b[68][6][2] = 17981 b[68][6][1] = 17982 b[68][6][0] = 17983 
c    b[68][7][2] = 17984 b[68][7][1] = 17985 b[68][7][0] = 17986 
c    b[68][8][2] = 17987 b[68][8][1] = 17988 b[68][8][0] = 17989 
c    b[68][9][2] = 17990 b[68][9][1] = 17991 b[68][9][0] = 17992 
c    b[68][10][2] = 17993 b[68][10][1] = 17994 b[68][10][0] = 17995 
c    b[68][11][2] = 17996 b[68][11][1] = 17997 b[68][11][0] = 17998 
c    b[68][12][2] = 17999 b[68][12][1] = 18000 b[68][12][0] = 18001 
c    b[68][13][2] = 18002 b[68][13][1] = 18003 b[68][13][0] = 18004 
c    b[68][14][2] = 18005 b[68][14][1] = 18006 b[68][14][0] = 18007 
c    b[68][15][2] = 18008 b[68][15][1] = 18009 b[68][15][0] = 18010 
c    b[68][16][2] = 18011 b[68][16][1] = 18012 b[68][16][0] = 18013 
c    b[68][17][2] = 18014 b[68][17][1] = 18015 b[68][17][0] = 18016 
c    b[68][18][2] = 18017 b[68][18][1] = 18018 b[68][18][0] = 18019 

c    b[69][1][2] = 18020 b[69][1][1] = 18021 b[69][1][0] = 18022 
c    b[69][2][2] = 18023 b[69][2][1] = 18024 b[69][2][0] = 18025 
c    b[69][3][2] = 18026 b[69][3][1] = 18027 b[69][3][0] = 18028 
c    b[69][4][2] = 18029 b[69][4][1] = 18030 b[69][4][0] = 18031 
c    b[69][5][2] = 18032 b[69][5][1] = 18033 b[69][5][0] = 18034 
c    b[69][6][2] = 18035 b[69][6][1] = 18036 b[69][6][0] = 18037 
c    b[69][7][2] = 18038 b[69][7][1] = 18039 b[69][7][0] = 18040 
c    b[69][8][2] = 18041 b[69][8][1] = 18042 b[69][8][0] = 18043 
c    b[69][9][2] = 18044 b[69][9][1] = 18045 b[69][9][0] = 18046 
c    b[69][10][2] = 18047 b[69][10][1] = 18048 b[69][10][0] = 18049 
c    b[69][11][2] = 18050 b[69][11][1] = 18051 b[69][11][0] = 18052 
c    b[69][12][2] = 18053 b[69][12][1] = 18054 b[69][12][0] = 18055 
c    b[69][13][2] = 18056 b[69][13][1] = 18057 b[69][13][0] = 18058 
c    b[69][14][2] = 18059 b[69][14][1] = 18060 b[69][14][0] = 18061 
c    b[69][15][2] = 18062 b[69][15][1] = 18063 b[69][15][0] = 18064 
c    b[69][16][2] = 18065 b[69][16][1] = 18066 b[69][16][0] = 18067 
c    b[69][17][2] = 18068 b[69][17][1] = 18069 b[69][17][0] = 18070 

c    b[70][1][2] = 18071 b[70][1][1] = 18072 b[70][1][0] = 18073 
c    b[70][2][2] = 18074 b[70][2][1] = 18075 b[70][2][0] = 18076 
c    b[70][3][2] = 18077 b[70][3][1] = 18078 b[70][3][0] = 18079 
c    b[70][4][2] = 18080 b[70][4][1] = 18081 b[70][4][0] = 18082 
c    b[70][5][2] = 18083 b[70][5][1] = 18084 b[70][5][0] = 18085 
c    b[70][6][2] = 18086 b[70][6][1] = 18087 b[70][6][0] = 18088 
c    b[70][7][2] = 18089 b[70][7][1] = 18090 b[70][7][0] = 18091 
c    b[70][8][2] = 18092 b[70][8][1] = 18093 b[70][8][0] = 18094 
c    b[70][9][2] = 18095 b[70][9][1] = 18096 b[70][9][0] = 18097 
c    b[70][10][2] = 18098 b[70][10][1] = 18099 b[70][10][0] = 18100 
c    b[70][11][2] = 18101 b[70][11][1] = 18102 b[70][11][0] = 18103 
c    b[70][12][2] = 18104 b[70][12][1] = 18105 b[70][12][0] = 18106 
c    b[70][13][2] = 18107 b[70][13][1] = 18108 b[70][13][0] = 18109 
c    b[70][14][2] = 18110 b[70][14][1] = 18111 b[70][14][0] = 18112 
c    b[70][15][2] = 18113 b[70][15][1] = 18114 b[70][15][0] = 18115 
c    b[70][16][2] = 18116 b[70][16][1] = 18117 b[70][16][0] = 18118 
c    b[70][17][2] = 18119 b[70][17][1] = 18120 b[70][17][0] = 18121 

c    b[71][1][2] = 18122 b[71][1][1] = 18123 b[71][1][0] = 18124 
c    b[71][2][2] = 18125 b[71][2][1] = 18126 b[71][2][0] = 18127 
c    b[71][3][2] = 18128 b[71][3][1] = 18129 b[71][3][0] = 18130 
c    b[71][4][2] = 18131 b[71][4][1] = 18132 b[71][4][0] = 18133 
c    b[71][5][2] = 18134 b[71][5][1] = 18135 b[71][5][0] = 18136 
c    b[71][6][2] = 18137 b[71][6][1] = 18138 b[71][6][0] = 18139 
c    b[71][7][2] = 18140 b[71][7][1] = 18141 b[71][7][0] = 18142 
c    b[71][8][2] = 18143 b[71][8][1] = 18144 b[71][8][0] = 18145 
c    b[71][9][2] = 18146 b[71][9][1] = 18147 b[71][9][0] = 18148 
c    b[71][10][2] = 18149 b[71][10][1] = 18150 b[71][10][0] = 18151 
c    b[71][11][2] = 18152 b[71][11][1] = 18153 b[71][11][0] = 18154 
c    b[71][12][2] = 18155 b[71][12][1] = 18156 b[71][12][0] = 18157 
c    b[71][13][2] = 18158 b[71][13][1] = 18159 b[71][13][0] = 18160 
c    b[71][14][2] = 18161 b[71][14][1] = 18162 b[71][14][0] = 18163 
c    b[71][15][2] = 18164 b[71][15][1] = 18165 b[71][15][0] = 18166 
c    b[71][16][2] = 18167 b[71][16][1] = 18168 b[71][16][0] = 18169 
c    b[71][17][2] = 18170 b[71][17][1] = 18171 b[71][17][0] = 18172 

c    b[72][1][2] = 18173 b[72][1][1] = 18174 b[72][1][0] = 18175 
c    b[72][2][2] = 18176 b[72][2][1] = 18177 b[72][2][0] = 18178 
c    b[72][3][2] = 18179 b[72][3][1] = 18180 b[72][3][0] = 18181 
c    b[72][4][2] = 18182 b[72][4][1] = 18183 b[72][4][0] = 18184 
c    b[72][5][2] = 18185 b[72][5][1] = 18186 b[72][5][0] = 18187 
c    b[72][6][2] = 18188 b[72][6][1] = 18189 b[72][6][0] = 18190 
c    b[72][7][2] = 18191 b[72][7][1] = 18192 b[72][7][0] = 18193 
c    b[72][8][2] = 18194 b[72][8][1] = 18195 b[72][8][0] = 18196 
c    b[72][9][2] = 18197 b[72][9][1] = 18198 b[72][9][0] = 18199 
c    b[72][10][2] = 18200 b[72][10][1] = 18201 b[72][10][0] = 18202 
c    b[72][11][2] = 18203 b[72][11][1] = 18204 b[72][11][0] = 18205 
c    b[72][12][2] = 18206 b[72][12][1] = 18207 b[72][12][0] = 18208 
c    b[72][13][2] = 18209 b[72][13][1] = 18210 b[72][13][0] = 18211 
c    b[72][14][2] = 18212 b[72][14][1] = 18213 b[72][14][0] = 18214 
c    b[72][15][2] = 18215 b[72][15][1] = 18216 b[72][15][0] = 18217 
c    b[72][16][2] = 18218 b[72][16][1] = 18219 b[72][16][0] = 18220 
c    b[72][17][2] = 18221 b[72][17][1] = 18222 b[72][17][0] = 18223 

c    b[73][1][2] = 18224 b[73][1][1] = 18225 b[73][1][0] = 18226 
c    b[73][2][2] = 18227 b[73][2][1] = 18228 b[73][2][0] = 18229 
c    b[73][3][2] = 18230 b[73][3][1] = 18231 b[73][3][0] = 18232 
c    b[73][4][2] = 18233 b[73][4][1] = 18234 b[73][4][0] = 18235 
c    b[73][5][2] = 18236 b[73][5][1] = 18237 b[73][5][0] = 18238 
c    b[73][6][2] = 18239 b[73][6][1] = 18240 b[73][6][0] = 18241 
c    b[73][7][2] = 18242 b[73][7][1] = 18243 b[73][7][0] = 18244 
c    b[73][8][2] = 18245 b[73][8][1] = 18246 b[73][8][0] = 18247 
c    b[73][9][2] = 18248 b[73][9][1] = 18249 b[73][9][0] = 18250 
c    b[73][10][2] = 18251 b[73][10][1] = 18252 b[73][10][0] = 18253 
c    b[73][11][2] = 18254 b[73][11][1] = 18255 b[73][11][0] = 18256 
c    b[73][12][2] = 18257 b[73][12][1] = 18258 b[73][12][0] = 18259 
c    b[73][13][2] = 18260 b[73][13][1] = 18261 b[73][13][0] = 18262 
c    b[73][14][2] = 18263 b[73][14][1] = 18264 b[73][14][0] = 18265 
c    b[73][15][2] = 18266 b[73][15][1] = 18267 b[73][15][0] = 18268 
c    b[73][16][2] = 18269 b[73][16][1] = 18270 b[73][16][0] = 18271 

c    b[74][1][2] = 18272 b[74][1][1] = 18273 b[74][1][0] = 18274 
c    b[74][2][2] = 18275 b[74][2][1] = 18276 b[74][2][0] = 18277 
c    b[74][3][2] = 18278 b[74][3][1] = 18279 b[74][3][0] = 18280 
c    b[74][4][2] = 18281 b[74][4][1] = 18282 b[74][4][0] = 18283 
c    b[74][5][2] = 18284 b[74][5][1] = 18285 b[74][5][0] = 18286 
c    b[74][6][2] = 18287 b[74][6][1] = 18288 b[74][6][0] = 18289 
c    b[74][7][2] = 18290 b[74][7][1] = 18291 b[74][7][0] = 18292 
c    b[74][8][2] = 18293 b[74][8][1] = 18294 b[74][8][0] = 18295 
c    b[74][9][2] = 18296 b[74][9][1] = 18297 b[74][9][0] = 18298 
c    b[74][10][2] = 18299 b[74][10][1] = 18300 b[74][10][0] = 18301 
c    b[74][11][2] = 18302 b[74][11][1] = 18303 b[74][11][0] = 18304 
c    b[74][12][2] = 18305 b[74][12][1] = 18306 b[74][12][0] = 18307 
c    b[74][13][2] = 18308 b[74][13][1] = 18309 b[74][13][0] = 18310 
c    b[74][14][2] = 18311 b[74][14][1] = 18312 b[74][14][0] = 18313 
c    b[74][15][2] = 18314 b[74][15][1] = 18315 b[74][15][0] = 18316 
c    b[74][16][2] = 18317 b[74][16][1] = 18318 b[74][16][0] = 18319 

c    b[75][1][2] = 18320 b[75][1][1] = 18321 b[75][1][0] = 18322 
c    b[75][2][2] = 18323 b[75][2][1] = 18324 b[75][2][0] = 18325 
c    b[75][3][2] = 18326 b[75][3][1] = 18327 b[75][3][0] = 18328 
c    b[75][4][2] = 18329 b[75][4][1] = 18330 b[75][4][0] = 18331 
c    b[75][5][2] = 18332 b[75][5][1] = 18333 b[75][5][0] = 18334 
c    b[75][6][2] = 18335 b[75][6][1] = 18336 b[75][6][0] = 18337 
c    b[75][7][2] = 18338 b[75][7][1] = 18339 b[75][7][0] = 18340 
c    b[75][8][2] = 18341 b[75][8][1] = 18342 b[75][8][0] = 18343 
c    b[75][9][2] = 18344 b[75][9][1] = 18345 b[75][9][0] = 18346 
c    b[75][10][2] = 18347 b[75][10][1] = 18348 b[75][10][0] = 18349 
c    b[75][11][2] = 18350 b[75][11][1] = 18351 b[75][11][0] = 18352 
c    b[75][12][2] = 18353 b[75][12][1] = 18354 b[75][12][0] = 18355 
c    b[75][13][2] = 18356 b[75][13][1] = 18357 b[75][13][0] = 18358 
c    b[75][14][2] = 18359 b[75][14][1] = 18360 b[75][14][0] = 18361 
c    b[75][15][2] = 18362 b[75][15][1] = 18363 b[75][15][0] = 18364 
c    b[75][16][2] = 18365 b[75][16][1] = 18366 b[75][16][0] = 18367 

c    b[76][1][2] = 18368 b[76][1][1] = 18369 b[76][1][0] = 18370 
c    b[76][2][2] = 18371 b[76][2][1] = 18372 b[76][2][0] = 18373 
c    b[76][3][2] = 18374 b[76][3][1] = 18375 b[76][3][0] = 18376 
c    b[76][4][2] = 18377 b[76][4][1] = 18378 b[76][4][0] = 18379 
c    b[76][5][2] = 18380 b[76][5][1] = 18381 b[76][5][0] = 18382 
c    b[76][6][2] = 18383 b[76][6][1] = 18384 b[76][6][0] = 18385 
c    b[76][7][2] = 18386 b[76][7][1] = 18387 b[76][7][0] = 18388 
c    b[76][8][2] = 18389 b[76][8][1] = 18390 b[76][8][0] = 18391 
c    b[76][9][2] = 18392 b[76][9][1] = 18393 b[76][9][0] = 18394 
c    b[76][10][2] = 18395 b[76][10][1] = 18396 b[76][10][0] = 18397 
c    b[76][11][2] = 18398 b[76][11][1] = 18399 b[76][11][0] = 18400 
c    b[76][12][2] = 18401 b[76][12][1] = 18402 b[76][12][0] = 18403 
c    b[76][13][2] = 18404 b[76][13][1] = 18405 b[76][13][0] = 18406 
c    b[76][14][2] = 18407 b[76][14][1] = 18408 b[76][14][0] = 18409 
c    b[76][15][2] = 18410 b[76][15][1] = 18411 b[76][15][0] = 18412 
c    b[76][16][2] = 18413 b[76][16][1] = 18414 b[76][16][0] = 18415 

c    b[77][1][2] = 18416 b[77][1][1] = 18417 b[77][1][0] = 18418 
c    b[77][2][2] = 18419 b[77][2][1] = 18420 b[77][2][0] = 18421 
c    b[77][3][2] = 18422 b[77][3][1] = 18423 b[77][3][0] = 18424 
c    b[77][4][2] = 18425 b[77][4][1] = 18426 b[77][4][0] = 18427 
c    b[77][5][2] = 18428 b[77][5][1] = 18429 b[77][5][0] = 18430 
c    b[77][6][2] = 18431 b[77][6][1] = 18432 b[77][6][0] = 18433 
c    b[77][7][2] = 18434 b[77][7][1] = 18435 b[77][7][0] = 18436 
c    b[77][8][2] = 18437 b[77][8][1] = 18438 b[77][8][0] = 18439 
c    b[77][9][2] = 18440 b[77][9][1] = 18441 b[77][9][0] = 18442 
c    b[77][10][2] = 18443 b[77][10][1] = 18444 b[77][10][0] = 18445 
c    b[77][11][2] = 18446 b[77][11][1] = 18447 b[77][11][0] = 18448 
c    b[77][12][2] = 18449 b[77][12][1] = 18450 b[77][12][0] = 18451 
c    b[77][13][2] = 18452 b[77][13][1] = 18453 b[77][13][0] = 18454 
c    b[77][14][2] = 18455 b[77][14][1] = 18456 b[77][14][0] = 18457 
c    b[77][15][2] = 18458 b[77][15][1] = 18459 b[77][15][0] = 18460 
c    b[77][16][2] = 18461 b[77][16][1] = 18462 b[77][16][0] = 18463 

c    b[78][1][2] = 18464 b[78][1][1] = 18465 b[78][1][0] = 18466 
c    b[78][2][2] = 18467 b[78][2][1] = 18468 b[78][2][0] = 18469 
c    b[78][3][2] = 18470 b[78][3][1] = 18471 b[78][3][0] = 18472 
c    b[78][4][2] = 18473 b[78][4][1] = 18474 b[78][4][0] = 18475 
c    b[78][5][2] = 18476 b[78][5][1] = 18477 b[78][5][0] = 18478 
c    b[78][6][2] = 18479 b[78][6][1] = 18480 b[78][6][0] = 18481 
c    b[78][7][2] = 18482 b[78][7][1] = 18483 b[78][7][0] = 18484 
c    b[78][8][2] = 18485 b[78][8][1] = 18486 b[78][8][0] = 18487 
c    b[78][9][2] = 18488 b[78][9][1] = 18489 b[78][9][0] = 18490 
c    b[78][10][2] = 18491 b[78][10][1] = 18492 b[78][10][0] = 18493 
c    b[78][11][2] = 18494 b[78][11][1] = 18495 b[78][11][0] = 18496 
c    b[78][12][2] = 18497 b[78][12][1] = 18498 b[78][12][0] = 18499 
c    b[78][13][2] = 18500 b[78][13][1] = 18501 b[78][13][0] = 18502 
c    b[78][14][2] = 18503 b[78][14][1] = 18504 b[78][14][0] = 18505 
c    b[78][15][2] = 18506 b[78][15][1] = 18507 b[78][15][0] = 18508 

c    b[79][1][2] = 18509 b[79][1][1] = 18510 b[79][1][0] = 18511 
c    b[79][2][2] = 18512 b[79][2][1] = 18513 b[79][2][0] = 18514 
c    b[79][3][2] = 18515 b[79][3][1] = 18516 b[79][3][0] = 18517 
c    b[79][4][2] = 18518 b[79][4][1] = 18519 b[79][4][0] = 18520 
c    b[79][5][2] = 18521 b[79][5][1] = 18522 b[79][5][0] = 18523 
c    b[79][6][2] = 18524 b[79][6][1] = 18525 b[79][6][0] = 18526 
c    b[79][7][2] = 18527 b[79][7][1] = 18528 b[79][7][0] = 18529 
c    b[79][8][2] = 18530 b[79][8][1] = 18531 b[79][8][0] = 18532 
c    b[79][9][2] = 18533 b[79][9][1] = 18534 b[79][9][0] = 18535 
c    b[79][10][2] = 18536 b[79][10][1] = 18537 b[79][10][0] = 18538 
c    b[79][11][2] = 18539 b[79][11][1] = 18540 b[79][11][0] = 18541 
c    b[79][12][2] = 18542 b[79][12][1] = 18543 b[79][12][0] = 18544 
c    b[79][13][2] = 18545 b[79][13][1] = 18546 b[79][13][0] = 18547 
c    b[79][14][2] = 18548 b[79][14][1] = 18549 b[79][14][0] = 18550 
c    b[79][15][2] = 18551 b[79][15][1] = 18552 b[79][15][0] = 18553 

c    b[80][1][2] = 18554 b[80][1][1] = 18555 b[80][1][0] = 18556 
c    b[80][2][2] = 18557 b[80][2][1] = 18558 b[80][2][0] = 18559 
c    b[80][3][2] = 18560 b[80][3][1] = 18561 b[80][3][0] = 18562 
c    b[80][4][2] = 18563 b[80][4][1] = 18564 b[80][4][0] = 18565 
c    b[80][5][2] = 18566 b[80][5][1] = 18567 b[80][5][0] = 18568 
c    b[80][6][2] = 18569 b[80][6][1] = 18570 b[80][6][0] = 18571 
c    b[80][7][2] = 18572 b[80][7][1] = 18573 b[80][7][0] = 18574 
c    b[80][8][2] = 18575 b[80][8][1] = 18576 b[80][8][0] = 18577 
c    b[80][9][2] = 18578 b[80][9][1] = 18579 b[80][9][0] = 18580 
c    b[80][10][2] = 18581 b[80][10][1] = 18582 b[80][10][0] = 18583 
c    b[80][11][2] = 18584 b[80][11][1] = 18585 b[80][11][0] = 18586 
c    b[80][12][2] = 18587 b[80][12][1] = 18588 b[80][12][0] = 18589 
c    b[80][13][2] = 18590 b[80][13][1] = 18591 b[80][13][0] = 18592 
c    b[80][14][2] = 18593 b[80][14][1] = 18594 b[80][14][0] = 18595 
c    b[80][15][2] = 18596 b[80][15][1] = 18597 b[80][15][0] = 18598 

c    b[81][1][2] = 18599 b[81][1][1] = 18600 b[81][1][0] = 18601 
c    b[81][2][2] = 18602 b[81][2][1] = 18603 b[81][2][0] = 18604 
c    b[81][3][2] = 18605 b[81][3][1] = 18606 b[81][3][0] = 18607 
c    b[81][4][2] = 18608 b[81][4][1] = 18609 b[81][4][0] = 18610 
c    b[81][5][2] = 18611 b[81][5][1] = 18612 b[81][5][0] = 18613 
c    b[81][6][2] = 18614 b[81][6][1] = 18615 b[81][6][0] = 18616 
c    b[81][7][2] = 18617 b[81][7][1] = 18618 b[81][7][0] = 18619 
c    b[81][8][2] = 18620 b[81][8][1] = 18621 b[81][8][0] = 18622 
c    b[81][9][2] = 18623 b[81][9][1] = 18624 b[81][9][0] = 18625 
c    b[81][10][2] = 18626 b[81][10][1] = 18627 b[81][10][0] = 18628 
c    b[81][11][2] = 18629 b[81][11][1] = 18630 b[81][11][0] = 18631 
c    b[81][12][2] = 18632 b[81][12][1] = 18633 b[81][12][0] = 18634 
c    b[81][13][2] = 18635 b[81][13][1] = 18636 b[81][13][0] = 18637 
c    b[81][14][2] = 18638 b[81][14][1] = 18639 b[81][14][0] = 18640 
c    b[81][15][2] = 18641 b[81][15][1] = 18642 b[81][15][0] = 18643 

c    b[82][1][2] = 18644 b[82][1][1] = 18645 b[82][1][0] = 18646 
c    b[82][2][2] = 18647 b[82][2][1] = 18648 b[82][2][0] = 18649 
c    b[82][3][2] = 18650 b[82][3][1] = 18651 b[82][3][0] = 18652 
c    b[82][4][2] = 18653 b[82][4][1] = 18654 b[82][4][0] = 18655 
c    b[82][5][2] = 18656 b[82][5][1] = 18657 b[82][5][0] = 18658 
c    b[82][6][2] = 18659 b[82][6][1] = 18660 b[82][6][0] = 18661 
c    b[82][7][2] = 18662 b[82][7][1] = 18663 b[82][7][0] = 18664 
c    b[82][8][2] = 18665 b[82][8][1] = 18666 b[82][8][0] = 18667 
c    b[82][9][2] = 18668 b[82][9][1] = 18669 b[82][9][0] = 18670 
c    b[82][10][2] = 18671 b[82][10][1] = 18672 b[82][10][0] = 18673 
c    b[82][11][2] = 18674 b[82][11][1] = 18675 b[82][11][0] = 18676 
c    b[82][12][2] = 18677 b[82][12][1] = 18678 b[82][12][0] = 18679 
c    b[82][13][2] = 18680 b[82][13][1] = 18681 b[82][13][0] = 18682 
c    b[82][14][2] = 18683 b[82][14][1] = 18684 b[82][14][0] = 18685 
c    b[82][15][2] = 18686 b[82][15][1] = 18687 b[82][15][0] = 18688 

c    b[83][1][2] = 18689 b[83][1][1] = 18690 b[83][1][0] = 18691 
c    b[83][2][2] = 18692 b[83][2][1] = 18693 b[83][2][0] = 18694 
c    b[83][3][2] = 18695 b[83][3][1] = 18696 b[83][3][0] = 18697 
c    b[83][4][2] = 18698 b[83][4][1] = 18699 b[83][4][0] = 18700 
c    b[83][5][2] = 18701 b[83][5][1] = 18702 b[83][5][0] = 18703 
c    b[83][6][2] = 18704 b[83][6][1] = 18705 b[83][6][0] = 18706 
c    b[83][7][2] = 18707 b[83][7][1] = 18708 b[83][7][0] = 18709 
c    b[83][8][2] = 18710 b[83][8][1] = 18711 b[83][8][0] = 18712 
c    b[83][9][2] = 18713 b[83][9][1] = 18714 b[83][9][0] = 18715 
c    b[83][10][2] = 18716 b[83][10][1] = 18717 b[83][10][0] = 18718 
c    b[83][11][2] = 18719 b[83][11][1] = 18720 b[83][11][0] = 18721 
c    b[83][12][2] = 18722 b[83][12][1] = 18723 b[83][12][0] = 18724 
c    b[83][13][2] = 18725 b[83][13][1] = 18726 b[83][13][0] = 18727 
c    b[83][14][2] = 18728 b[83][14][1] = 18729 b[83][14][0] = 18730 

c    b[84][1][2] = 18731 b[84][1][1] = 18732 b[84][1][0] = 18733 
c    b[84][2][2] = 18734 b[84][2][1] = 18735 b[84][2][0] = 18736 
c    b[84][3][2] = 18737 b[84][3][1] = 18738 b[84][3][0] = 18739 
c    b[84][4][2] = 18740 b[84][4][1] = 18741 b[84][4][0] = 18742 
c    b[84][5][2] = 18743 b[84][5][1] = 18744 b[84][5][0] = 18745 
c    b[84][6][2] = 18746 b[84][6][1] = 18747 b[84][6][0] = 18748 
c    b[84][7][2] = 18749 b[84][7][1] = 18750 b[84][7][0] = 18751 
c    b[84][8][2] = 18752 b[84][8][1] = 18753 b[84][8][0] = 18754 
c    b[84][9][2] = 18755 b[84][9][1] = 18756 b[84][9][0] = 18757 
c    b[84][10][2] = 18758 b[84][10][1] = 18759 b[84][10][0] = 18760 
c    b[84][11][2] = 18761 b[84][11][1] = 18762 b[84][11][0] = 18763 
c    b[84][12][2] = 18764 b[84][12][1] = 18765 b[84][12][0] = 18766 
c    b[84][13][2] = 18767 b[84][13][1] = 18768 b[84][13][0] = 18769 
c    b[84][14][2] = 18770 b[84][14][1] = 18771 b[84][14][0] = 18772 

c    b[85][1][2] = 18773 b[85][1][1] = 18774 b[85][1][0] = 18775 
c    b[85][2][2] = 18776 b[85][2][1] = 18777 b[85][2][0] = 18778 
c    b[85][3][2] = 18779 b[85][3][1] = 18780 b[85][3][0] = 18781 
c    b[85][4][2] = 18782 b[85][4][1] = 18783 b[85][4][0] = 18784 
c    b[85][5][2] = 18785 b[85][5][1] = 18786 b[85][5][0] = 18787 
c    b[85][6][2] = 18788 b[85][6][1] = 18789 b[85][6][0] = 18790 
c    b[85][7][2] = 18791 b[85][7][1] = 18792 b[85][7][0] = 18793 
c    b[85][8][2] = 18794 b[85][8][1] = 18795 b[85][8][0] = 18796 
c    b[85][9][2] = 18797 b[85][9][1] = 18798 b[85][9][0] = 18799 
c    b[85][10][2] = 18800 b[85][10][1] = 18801 b[85][10][0] = 18802 
c    b[85][11][2] = 18803 b[85][11][1] = 18804 b[85][11][0] = 18805 
c    b[85][12][2] = 18806 b[85][12][1] = 18807 b[85][12][0] = 18808 
c    b[85][13][2] = 18809 b[85][13][1] = 18810 b[85][13][0] = 18811 
c    b[85][14][2] = 18812 b[85][14][1] = 18813 b[85][14][0] = 18814 

c    b[86][1][2] = 18815 b[86][1][1] = 18816 b[86][1][0] = 18817 
c    b[86][2][2] = 18818 b[86][2][1] = 18819 b[86][2][0] = 18820 
c    b[86][3][2] = 18821 b[86][3][1] = 18822 b[86][3][0] = 18823 
c    b[86][4][2] = 18824 b[86][4][1] = 18825 b[86][4][0] = 18826 
c    b[86][5][2] = 18827 b[86][5][1] = 18828 b[86][5][0] = 18829 
c    b[86][6][2] = 18830 b[86][6][1] = 18831 b[86][6][0] = 18832 
c    b[86][7][2] = 18833 b[86][7][1] = 18834 b[86][7][0] = 18835 
c    b[86][8][2] = 18836 b[86][8][1] = 18837 b[86][8][0] = 18838 
c    b[86][9][2] = 18839 b[86][9][1] = 18840 b[86][9][0] = 18841 
c    b[86][10][2] = 18842 b[86][10][1] = 18843 b[86][10][0] = 18844 
c    b[86][11][2] = 18845 b[86][11][1] = 18846 b[86][11][0] = 18847 
c    b[86][12][2] = 18848 b[86][12][1] = 18849 b[86][12][0] = 18850 
c    b[86][13][2] = 18851 b[86][13][1] = 18852 b[86][13][0] = 18853 
c    b[86][14][2] = 18854 b[86][14][1] = 18855 b[86][14][0] = 18856 

c    b[87][1][2] = 18857 b[87][1][1] = 18858 b[87][1][0] = 18859 
c    b[87][2][2] = 18860 b[87][2][1] = 18861 b[87][2][0] = 18862 
c    b[87][3][2] = 18863 b[87][3][1] = 18864 b[87][3][0] = 18865 
c    b[87][4][2] = 18866 b[87][4][1] = 18867 b[87][4][0] = 18868 
c    b[87][5][2] = 18869 b[87][5][1] = 18870 b[87][5][0] = 18871 
c    b[87][6][2] = 18872 b[87][6][1] = 18873 b[87][6][0] = 18874 
c    b[87][7][2] = 18875 b[87][7][1] = 18876 b[87][7][0] = 18877 
c    b[87][8][2] = 18878 b[87][8][1] = 18879 b[87][8][0] = 18880 
c    b[87][9][2] = 18881 b[87][9][1] = 18882 b[87][9][0] = 18883 
c    b[87][10][2] = 18884 b[87][10][1] = 18885 b[87][10][0] = 18886 
c    b[87][11][2] = 18887 b[87][11][1] = 18888 b[87][11][0] = 18889 
c    b[87][12][2] = 18890 b[87][12][1] = 18891 b[87][12][0] = 18892 
c    b[87][13][2] = 18893 b[87][13][1] = 18894 b[87][13][0] = 18895 
c    b[87][14][2] = 18896 b[87][14][1] = 18897 b[87][14][0] = 18898 

c    b[88][1][2] = 18899 b[88][1][1] = 18900 b[88][1][0] = 18901 
c    b[88][2][2] = 18902 b[88][2][1] = 18903 b[88][2][0] = 18904 
c    b[88][3][2] = 18905 b[88][3][1] = 18906 b[88][3][0] = 18907 
c    b[88][4][2] = 18908 b[88][4][1] = 18909 b[88][4][0] = 18910 
c    b[88][5][2] = 18911 b[88][5][1] = 18912 b[88][5][0] = 18913 
c    b[88][6][2] = 18914 b[88][6][1] = 18915 b[88][6][0] = 18916 
c    b[88][7][2] = 18917 b[88][7][1] = 18918 b[88][7][0] = 18919 
c    b[88][8][2] = 18920 b[88][8][1] = 18921 b[88][8][0] = 18922 
c    b[88][9][2] = 18923 b[88][9][1] = 18924 b[88][9][0] = 18925 
c    b[88][10][2] = 18926 b[88][10][1] = 18927 b[88][10][0] = 18928 
c    b[88][11][2] = 18929 b[88][11][1] = 18930 b[88][11][0] = 18931 
c    b[88][12][2] = 18932 b[88][12][1] = 18933 b[88][12][0] = 18934 
c    b[88][13][2] = 18935 b[88][13][1] = 18936 b[88][13][0] = 18937 
c    b[88][14][2] = 18938 b[88][14][1] = 18939 b[88][14][0] = 18940 

c    b[89][1][2] = 18941 b[89][1][1] = 18942 b[89][1][0] = 18943 
c    b[89][2][2] = 18944 b[89][2][1] = 18945 b[89][2][0] = 18946 
c    b[89][3][2] = 18947 b[89][3][1] = 18948 b[89][3][0] = 18949 
c    b[89][4][2] = 18950 b[89][4][1] = 18951 b[89][4][0] = 18952 
c    b[89][5][2] = 18953 b[89][5][1] = 18954 b[89][5][0] = 18955 
c    b[89][6][2] = 18956 b[89][6][1] = 18957 b[89][6][0] = 18958 
c    b[89][7][2] = 18959 b[89][7][1] = 18960 b[89][7][0] = 18961 
c    b[89][8][2] = 18962 b[89][8][1] = 18963 b[89][8][0] = 18964 
c    b[89][9][2] = 18965 b[89][9][1] = 18966 b[89][9][0] = 18967 
c    b[89][10][2] = 18968 b[89][10][1] = 18969 b[89][10][0] = 18970 
c    b[89][11][2] = 18971 b[89][11][1] = 18972 b[89][11][0] = 18973 
c    b[89][12][2] = 18974 b[89][12][1] = 18975 b[89][12][0] = 18976 
c    b[89][13][2] = 18977 b[89][13][1] = 18978 b[89][13][0] = 18979 
c    b[89][14][2] = 18980 b[89][14][1] = 18981 b[89][14][0] = 18982 

c    b[90][1][2] = 18983 b[90][1][1] = 18984 b[90][1][0] = 18985 
c    b[90][2][2] = 18986 b[90][2][1] = 18987 b[90][2][0] = 18988 
c    b[90][3][2] = 18989 b[90][3][1] = 18990 b[90][3][0] = 18991 
c    b[90][4][2] = 18992 b[90][4][1] = 18993 b[90][4][0] = 18994 
c    b[90][5][2] = 18995 b[90][5][1] = 18996 b[90][5][0] = 18997 
c    b[90][6][2] = 18998 b[90][6][1] = 18999 b[90][6][0] = 19000 
c    b[90][7][2] = 19001 b[90][7][1] = 19002 b[90][7][0] = 19003 
c    b[90][8][2] = 19004 b[90][8][1] = 19005 b[90][8][0] = 19006 
c    b[90][9][2] = 19007 b[90][9][1] = 19008 b[90][9][0] = 19009 
c    b[90][10][2] = 19010 b[90][10][1] = 19011 b[90][10][0] = 19012 
c    b[90][11][2] = 19013 b[90][11][1] = 19014 b[90][11][0] = 19015 
c    b[90][12][2] = 19016 b[90][12][1] = 19017 b[90][12][0] = 19018 
c    b[90][13][2] = 19019 b[90][13][1] = 19020 b[90][13][0] = 19021 

c    b[91][1][2] = 19022 b[91][1][1] = 19023 b[91][1][0] = 19024 
c    b[91][2][2] = 19025 b[91][2][1] = 19026 b[91][2][0] = 19027 
c    b[91][3][2] = 19028 b[91][3][1] = 19029 b[91][3][0] = 19030 
c    b[91][4][2] = 19031 b[91][4][1] = 19032 b[91][4][0] = 19033 
c    b[91][5][2] = 19034 b[91][5][1] = 19035 b[91][5][0] = 19036 
c    b[91][6][2] = 19037 b[91][6][1] = 19038 b[91][6][0] = 19039 
c    b[91][7][2] = 19040 b[91][7][1] = 19041 b[91][7][0] = 19042 
c    b[91][8][2] = 19043 b[91][8][1] = 19044 b[91][8][0] = 19045 
c    b[91][9][2] = 19046 b[91][9][1] = 19047 b[91][9][0] = 19048 
c    b[91][10][2] = 19049 b[91][10][1] = 19050 b[91][10][0] = 19051 
c    b[91][11][2] = 19052 b[91][11][1] = 19053 b[91][11][0] = 19054 
c    b[91][12][2] = 19055 b[91][12][1] = 19056 b[91][12][0] = 19057 
c    b[91][13][2] = 19058 b[91][13][1] = 19059 b[91][13][0] = 19060 

c    b[92][1][2] = 19061 b[92][1][1] = 19062 b[92][1][0] = 19063 
c    b[92][2][2] = 19064 b[92][2][1] = 19065 b[92][2][0] = 19066 
c    b[92][3][2] = 19067 b[92][3][1] = 19068 b[92][3][0] = 19069 
c    b[92][4][2] = 19070 b[92][4][1] = 19071 b[92][4][0] = 19072 
c    b[92][5][2] = 19073 b[92][5][1] = 19074 b[92][5][0] = 19075 
c    b[92][6][2] = 19076 b[92][6][1] = 19077 b[92][6][0] = 19078 
c    b[92][7][2] = 19079 b[92][7][1] = 19080 b[92][7][0] = 19081 
c    b[92][8][2] = 19082 b[92][8][1] = 19083 b[92][8][0] = 19084 
c    b[92][9][2] = 19085 b[92][9][1] = 19086 b[92][9][0] = 19087 
c    b[92][10][2] = 19088 b[92][10][1] = 19089 b[92][10][0] = 19090 
c    b[92][11][2] = 19091 b[92][11][1] = 19092 b[92][11][0] = 19093 
c    b[92][12][2] = 19094 b[92][12][1] = 19095 b[92][12][0] = 19096 
c    b[92][13][2] = 19097 b[92][13][1] = 19098 b[92][13][0] = 19099 

c    b[93][1][2] = 19100 b[93][1][1] = 19101 b[93][1][0] = 19102 
c    b[93][2][2] = 19103 b[93][2][1] = 19104 b[93][2][0] = 19105 
c    b[93][3][2] = 19106 b[93][3][1] = 19107 b[93][3][0] = 19108 
c    b[93][4][2] = 19109 b[93][4][1] = 19110 b[93][4][0] = 19111 
c    b[93][5][2] = 19112 b[93][5][1] = 19113 b[93][5][0] = 19114 
c    b[93][6][2] = 19115 b[93][6][1] = 19116 b[93][6][0] = 19117 
c    b[93][7][2] = 19118 b[93][7][1] = 19119 b[93][7][0] = 19120 
c    b[93][8][2] = 19121 b[93][8][1] = 19122 b[93][8][0] = 19123 
c    b[93][9][2] = 19124 b[93][9][1] = 19125 b[93][9][0] = 19126 
c    b[93][10][2] = 19127 b[93][10][1] = 19128 b[93][10][0] = 19129 
c    b[93][11][2] = 19130 b[93][11][1] = 19131 b[93][11][0] = 19132 
c    b[93][12][2] = 19133 b[93][12][1] = 19134 b[93][12][0] = 19135 
c    b[93][13][2] = 19136 b[93][13][1] = 19137 b[93][13][0] = 19138 

c    b[94][1][2] = 19139 b[94][1][1] = 19140 b[94][1][0] = 19141 
c    b[94][2][2] = 19142 b[94][2][1] = 19143 b[94][2][0] = 19144 
c    b[94][3][2] = 19145 b[94][3][1] = 19146 b[94][3][0] = 19147 
c    b[94][4][2] = 19148 b[94][4][1] = 19149 b[94][4][0] = 19150 
c    b[94][5][2] = 19151 b[94][5][1] = 19152 b[94][5][0] = 19153 
c    b[94][6][2] = 19154 b[94][6][1] = 19155 b[94][6][0] = 19156 
c    b[94][7][2] = 19157 b[94][7][1] = 19158 b[94][7][0] = 19159 
c    b[94][8][2] = 19160 b[94][8][1] = 19161 b[94][8][0] = 19162 
c    b[94][9][2] = 19163 b[94][9][1] = 19164 b[94][9][0] = 19165 
c    b[94][10][2] = 19166 b[94][10][1] = 19167 b[94][10][0] = 19168 
c    b[94][11][2] = 19169 b[94][11][1] = 19170 b[94][11][0] = 19171 
c    b[94][12][2] = 19172 b[94][12][1] = 19173 b[94][12][0] = 19174 
c    b[94][13][2] = 19175 b[94][13][1] = 19176 b[94][13][0] = 19177 

c    b[95][1][2] = 19178 b[95][1][1] = 19179 b[95][1][0] = 19180 
c    b[95][2][2] = 19181 b[95][2][1] = 19182 b[95][2][0] = 19183 
c    b[95][3][2] = 19184 b[95][3][1] = 19185 b[95][3][0] = 19186 
c    b[95][4][2] = 19187 b[95][4][1] = 19188 b[95][4][0] = 19189 
c    b[95][5][2] = 19190 b[95][5][1] = 19191 b[95][5][0] = 19192 
c    b[95][6][2] = 19193 b[95][6][1] = 19194 b[95][6][0] = 19195 
c    b[95][7][2] = 19196 b[95][7][1] = 19197 b[95][7][0] = 19198 
c    b[95][8][2] = 19199 b[95][8][1] = 19200 b[95][8][0] = 19201 
c    b[95][9][2] = 19202 b[95][9][1] = 19203 b[95][9][0] = 19204 
c    b[95][10][2] = 19205 b[95][10][1] = 19206 b[95][10][0] = 19207 
c    b[95][11][2] = 19208 b[95][11][1] = 19209 b[95][11][0] = 19210 
c    b[95][12][2] = 19211 b[95][12][1] = 19212 b[95][12][0] = 19213 
c    b[95][13][2] = 19214 b[95][13][1] = 19215 b[95][13][0] = 19216 

c    b[96][1][2] = 19217 b[96][1][1] = 19218 b[96][1][0] = 19219 
c    b[96][2][2] = 19220 b[96][2][1] = 19221 b[96][2][0] = 19222 
c    b[96][3][2] = 19223 b[96][3][1] = 19224 b[96][3][0] = 19225 
c    b[96][4][2] = 19226 b[96][4][1] = 19227 b[96][4][0] = 19228 
c    b[96][5][2] = 19229 b[96][5][1] = 19230 b[96][5][0] = 19231 
c    b[96][6][2] = 19232 b[96][6][1] = 19233 b[96][6][0] = 19234 
c    b[96][7][2] = 19235 b[96][7][1] = 19236 b[96][7][0] = 19237 
c    b[96][8][2] = 19238 b[96][8][1] = 19239 b[96][8][0] = 19240 
c    b[96][9][2] = 19241 b[96][9][1] = 19242 b[96][9][0] = 19243 
c    b[96][10][2] = 19244 b[96][10][1] = 19245 b[96][10][0] = 19246 
c    b[96][11][2] = 19247 b[96][11][1] = 19248 b[96][11][0] = 19249 
c    b[96][12][2] = 19250 b[96][12][1] = 19251 b[96][12][0] = 19252 
c    b[96][13][2] = 19253 b[96][13][1] = 19254 b[96][13][0] = 19255 

c    b[97][1][2] = 19256 b[97][1][1] = 19257 b[97][1][0] = 19258 
c    b[97][2][2] = 19259 b[97][2][1] = 19260 b[97][2][0] = 19261 
c    b[97][3][2] = 19262 b[97][3][1] = 19263 b[97][3][0] = 19264 
c    b[97][4][2] = 19265 b[97][4][1] = 19266 b[97][4][0] = 19267 
c    b[97][5][2] = 19268 b[97][5][1] = 19269 b[97][5][0] = 19270 
c    b[97][6][2] = 19271 b[97][6][1] = 19272 b[97][6][0] = 19273 
c    b[97][7][2] = 19274 b[97][7][1] = 19275 b[97][7][0] = 19276 
c    b[97][8][2] = 19277 b[97][8][1] = 19278 b[97][8][0] = 19279 
c    b[97][9][2] = 19280 b[97][9][1] = 19281 b[97][9][0] = 19282 
c    b[97][10][2] = 19283 b[97][10][1] = 19284 b[97][10][0] = 19285 
c    b[97][11][2] = 19286 b[97][11][1] = 19287 b[97][11][0] = 19288 
c    b[97][12][2] = 19289 b[97][12][1] = 19290 b[97][12][0] = 19291 

c    b[98][1][2] = 19292 b[98][1][1] = 19293 b[98][1][0] = 19294 
c    b[98][2][2] = 19295 b[98][2][1] = 19296 b[98][2][0] = 19297 
c    b[98][3][2] = 19298 b[98][3][1] = 19299 b[98][3][0] = 19300 
c    b[98][4][2] = 19301 b[98][4][1] = 19302 b[98][4][0] = 19303 
c    b[98][5][2] = 19304 b[98][5][1] = 19305 b[98][5][0] = 19306 
c    b[98][6][2] = 19307 b[98][6][1] = 19308 b[98][6][0] = 19309 
c    b[98][7][2] = 19310 b[98][7][1] = 19311 b[98][7][0] = 19312 
c    b[98][8][2] = 19313 b[98][8][1] = 19314 b[98][8][0] = 19315 
c    b[98][9][2] = 19316 b[98][9][1] = 19317 b[98][9][0] = 19318 
c    b[98][10][2] = 19319 b[98][10][1] = 19320 b[98][10][0] = 19321 
c    b[98][11][2] = 19322 b[98][11][1] = 19323 b[98][11][0] = 19324 
c    b[98][12][2] = 19325 b[98][12][1] = 19326 b[98][12][0] = 19327 

c    b[99][1][2] = 19328 b[99][1][1] = 19329 b[99][1][0] = 19330 
c    b[99][2][2] = 19331 b[99][2][1] = 19332 b[99][2][0] = 19333 
c    b[99][3][2] = 19334 b[99][3][1] = 19335 b[99][3][0] = 19336 
c    b[99][4][2] = 19337 b[99][4][1] = 19338 b[99][4][0] = 19339 
c    b[99][5][2] = 19340 b[99][5][1] = 19341 b[99][5][0] = 19342 
c    b[99][6][2] = 19343 b[99][6][1] = 19344 b[99][6][0] = 19345 
c    b[99][7][2] = 19346 b[99][7][1] = 19347 b[99][7][0] = 19348 
c    b[99][8][2] = 19349 b[99][8][1] = 19350 b[99][8][0] = 19351 
c    b[99][9][2] = 19352 b[99][9][1] = 19353 b[99][9][0] = 19354 
c    b[99][10][2] = 19355 b[99][10][1] = 19356 b[99][10][0] = 19357 
c    b[99][11][2] = 19358 b[99][11][1] = 19359 b[99][11][0] = 19360 
c    b[99][12][2] = 19361 b[99][12][1] = 19362 b[99][12][0] = 19363 

c    b[100][1][2] = 19364 b[100][1][1] = 19365 b[100][1][0] = 19366 
c    b[100][2][2] = 19367 b[100][2][1] = 19368 b[100][2][0] = 19369 
c    b[100][3][2] = 19370 b[100][3][1] = 19371 b[100][3][0] = 19372 
c    b[100][4][2] = 19373 b[100][4][1] = 19374 b[100][4][0] = 19375 
c    b[100][5][2] = 19376 b[100][5][1] = 19377 b[100][5][0] = 19378 
c    b[100][6][2] = 19379 b[100][6][1] = 19380 b[100][6][0] = 19381 
c    b[100][7][2] = 19382 b[100][7][1] = 19383 b[100][7][0] = 19384 
c    b[100][8][2] = 19385 b[100][8][1] = 19386 b[100][8][0] = 19387 
c    b[100][9][2] = 19388 b[100][9][1] = 19389 b[100][9][0] = 19390 
c    b[100][10][2] = 19391 b[100][10][1] = 19392 b[100][10][0] = 19393 
c    b[100][11][2] = 19394 b[100][11][1] = 19395 b[100][11][0] = 19396 
c    b[100][12][2] = 19397 b[100][12][1] = 19398 b[100][12][0] = 19399 

c    b[101][1][2] = 19400 b[101][1][1] = 19401 b[101][1][0] = 19402 
c    b[101][2][2] = 19403 b[101][2][1] = 19404 b[101][2][0] = 19405 
c    b[101][3][2] = 19406 b[101][3][1] = 19407 b[101][3][0] = 19408 
c    b[101][4][2] = 19409 b[101][4][1] = 19410 b[101][4][0] = 19411 
c    b[101][5][2] = 19412 b[101][5][1] = 19413 b[101][5][0] = 19414 
c    b[101][6][2] = 19415 b[101][6][1] = 19416 b[101][6][0] = 19417 
c    b[101][7][2] = 19418 b[101][7][1] = 19419 b[101][7][0] = 19420 
c    b[101][8][2] = 19421 b[101][8][1] = 19422 b[101][8][0] = 19423 
c    b[101][9][2] = 19424 b[101][9][1] = 19425 b[101][9][0] = 19426 
c    b[101][10][2] = 19427 b[101][10][1] = 19428 b[101][10][0] = 19429 
c    b[101][11][2] = 19430 b[101][11][1] = 19431 b[101][11][0] = 19432 
c    b[101][12][2] = 19433 b[101][12][1] = 19434 b[101][12][0] = 19435 

c    b[102][1][2] = 19436 b[102][1][1] = 19437 b[102][1][0] = 19438 
c    b[102][2][2] = 19439 b[102][2][1] = 19440 b[102][2][0] = 19441 
c    b[102][3][2] = 19442 b[102][3][1] = 19443 b[102][3][0] = 19444 
c    b[102][4][2] = 19445 b[102][4][1] = 19446 b[102][4][0] = 19447 
c    b[102][5][2] = 19448 b[102][5][1] = 19449 b[102][5][0] = 19450 
c    b[102][6][2] = 19451 b[102][6][1] = 19452 b[102][6][0] = 19453 
c    b[102][7][2] = 19454 b[102][7][1] = 19455 b[102][7][0] = 19456 
c    b[102][8][2] = 19457 b[102][8][1] = 19458 b[102][8][0] = 19459 
c    b[102][9][2] = 19460 b[102][9][1] = 19461 b[102][9][0] = 19462 
c    b[102][10][2] = 19463 b[102][10][1] = 19464 b[102][10][0] = 19465 
c    b[102][11][2] = 19466 b[102][11][1] = 19467 b[102][11][0] = 19468 
c    b[102][12][2] = 19469 b[102][12][1] = 19470 b[102][12][0] = 19471 

c    b[103][1][2] = 19472 b[103][1][1] = 19473 b[103][1][0] = 19474 
c    b[103][2][2] = 19475 b[103][2][1] = 19476 b[103][2][0] = 19477 
c    b[103][3][2] = 19478 b[103][3][1] = 19479 b[103][3][0] = 19480 
c    b[103][4][2] = 19481 b[103][4][1] = 19482 b[103][4][0] = 19483 
c    b[103][5][2] = 19484 b[103][5][1] = 19485 b[103][5][0] = 19486 
c    b[103][6][2] = 19487 b[103][6][1] = 19488 b[103][6][0] = 19489 
c    b[103][7][2] = 19490 b[103][7][1] = 19491 b[103][7][0] = 19492 
c    b[103][8][2] = 19493 b[103][8][1] = 19494 b[103][8][0] = 19495 
c    b[103][9][2] = 19496 b[103][9][1] = 19497 b[103][9][0] = 19498 
c    b[103][10][2] = 19499 b[103][10][1] = 19500 b[103][10][0] = 19501 
c    b[103][11][2] = 19502 b[103][11][1] = 19503 b[103][11][0] = 19504 
c    b[103][12][2] = 19505 b[103][12][1] = 19506 b[103][12][0] = 19507 

c    b[104][1][2] = 19508 b[104][1][1] = 19509 b[104][1][0] = 19510 
c    b[104][2][2] = 19511 b[104][2][1] = 19512 b[104][2][0] = 19513 
c    b[104][3][2] = 19514 b[104][3][1] = 19515 b[104][3][0] = 19516 
c    b[104][4][2] = 19517 b[104][4][1] = 19518 b[104][4][0] = 19519 
c    b[104][5][2] = 19520 b[104][5][1] = 19521 b[104][5][0] = 19522 
c    b[104][6][2] = 19523 b[104][6][1] = 19524 b[104][6][0] = 19525 
c    b[104][7][2] = 19526 b[104][7][1] = 19527 b[104][7][0] = 19528 
c    b[104][8][2] = 19529 b[104][8][1] = 19530 b[104][8][0] = 19531 
c    b[104][9][2] = 19532 b[104][9][1] = 19533 b[104][9][0] = 19534 
c    b[104][10][2] = 19535 b[104][10][1] = 19536 b[104][10][0] = 19537 
c    b[104][11][2] = 19538 b[104][11][1] = 19539 b[104][11][0] = 19540 
c    b[104][12][2] = 19541 b[104][12][1] = 19542 b[104][12][0] = 19543 

c    b[105][1][2] = 19544 b[105][1][1] = 19545 b[105][1][0] = 19546 
c    b[105][2][2] = 19547 b[105][2][1] = 19548 b[105][2][0] = 19549 
c    b[105][3][2] = 19550 b[105][3][1] = 19551 b[105][3][0] = 19552 
c    b[105][4][2] = 19553 b[105][4][1] = 19554 b[105][4][0] = 19555 
c    b[105][5][2] = 19556 b[105][5][1] = 19557 b[105][5][0] = 19558 
c    b[105][6][2] = 19559 b[105][6][1] = 19560 b[105][6][0] = 19561 
c    b[105][7][2] = 19562 b[105][7][1] = 19563 b[105][7][0] = 19564 
c    b[105][8][2] = 19565 b[105][8][1] = 19566 b[105][8][0] = 19567 
c    b[105][9][2] = 19568 b[105][9][1] = 19569 b[105][9][0] = 19570 
c    b[105][10][2] = 19571 b[105][10][1] = 19572 b[105][10][0] = 19573 
c    b[105][11][2] = 19574 b[105][11][1] = 19575 b[105][11][0] = 19576 
c    b[105][12][2] = 19577 b[105][12][1] = 19578 b[105][12][0] = 19579 

c    b[106][1][2] = 19580 b[106][1][1] = 19581 b[106][1][0] = 19582 
c    b[106][2][2] = 19583 b[106][2][1] = 19584 b[106][2][0] = 19585 
c    b[106][3][2] = 19586 b[106][3][1] = 19587 b[106][3][0] = 19588 
c    b[106][4][2] = 19589 b[106][4][1] = 19590 b[106][4][0] = 19591 
c    b[106][5][2] = 19592 b[106][5][1] = 19593 b[106][5][0] = 19594 
c    b[106][6][2] = 19595 b[106][6][1] = 19596 b[106][6][0] = 19597 
c    b[106][7][2] = 19598 b[106][7][1] = 19599 b[106][7][0] = 19600 
c    b[106][8][2] = 19601 b[106][8][1] = 19602 b[106][8][0] = 19603 
c    b[106][9][2] = 19604 b[106][9][1] = 19605 b[106][9][0] = 19606 
c    b[106][10][2] = 19607 b[106][10][1] = 19608 b[106][10][0] = 19609 
c    b[106][11][2] = 19610 b[106][11][1] = 19611 b[106][11][0] = 19612 

c    b[107][1][2] = 19613 b[107][1][1] = 19614 b[107][1][0] = 19615 
c    b[107][2][2] = 19616 b[107][2][1] = 19617 b[107][2][0] = 19618 
c    b[107][3][2] = 19619 b[107][3][1] = 19620 b[107][3][0] = 19621 
c    b[107][4][2] = 19622 b[107][4][1] = 19623 b[107][4][0] = 19624 
c    b[107][5][2] = 19625 b[107][5][1] = 19626 b[107][5][0] = 19627 
c    b[107][6][2] = 19628 b[107][6][1] = 19629 b[107][6][0] = 19630 
c    b[107][7][2] = 19631 b[107][7][1] = 19632 b[107][7][0] = 19633 
c    b[107][8][2] = 19634 b[107][8][1] = 19635 b[107][8][0] = 19636 
c    b[107][9][2] = 19637 b[107][9][1] = 19638 b[107][9][0] = 19639 
c    b[107][10][2] = 19640 b[107][10][1] = 19641 b[107][10][0] = 19642 
c    b[107][11][2] = 19643 b[107][11][1] = 19644 b[107][11][0] = 19645 

c    b[108][1][2] = 19646 b[108][1][1] = 19647 b[108][1][0] = 19648 
c    b[108][2][2] = 19649 b[108][2][1] = 19650 b[108][2][0] = 19651 
c    b[108][3][2] = 19652 b[108][3][1] = 19653 b[108][3][0] = 19654 
c    b[108][4][2] = 19655 b[108][4][1] = 19656 b[108][4][0] = 19657 
c    b[108][5][2] = 19658 b[108][5][1] = 19659 b[108][5][0] = 19660 
c    b[108][6][2] = 19661 b[108][6][1] = 19662 b[108][6][0] = 19663 
c    b[108][7][2] = 19664 b[108][7][1] = 19665 b[108][7][0] = 19666 
c    b[108][8][2] = 19667 b[108][8][1] = 19668 b[108][8][0] = 19669 
c    b[108][9][2] = 19670 b[108][9][1] = 19671 b[108][9][0] = 19672 
c    b[108][10][2] = 19673 b[108][10][1] = 19674 b[108][10][0] = 19675 
c    b[108][11][2] = 19676 b[108][11][1] = 19677 b[108][11][0] = 19678 

c    b[109][1][2] = 19679 b[109][1][1] = 19680 b[109][1][0] = 19681 
c    b[109][2][2] = 19682 b[109][2][1] = 19683 b[109][2][0] = 19684 
c    b[109][3][2] = 19685 b[109][3][1] = 19686 b[109][3][0] = 19687 
c    b[109][4][2] = 19688 b[109][4][1] = 19689 b[109][4][0] = 19690 
c    b[109][5][2] = 19691 b[109][5][1] = 19692 b[109][5][0] = 19693 
c    b[109][6][2] = 19694 b[109][6][1] = 19695 b[109][6][0] = 19696 
c    b[109][7][2] = 19697 b[109][7][1] = 19698 b[109][7][0] = 19699 
c    b[109][8][2] = 19700 b[109][8][1] = 19701 b[109][8][0] = 19702 
c    b[109][9][2] = 19703 b[109][9][1] = 19704 b[109][9][0] = 19705 
c    b[109][10][2] = 19706 b[109][10][1] = 19707 b[109][10][0] = 19708 
c    b[109][11][2] = 19709 b[109][11][1] = 19710 b[109][11][0] = 19711 

c    b[110][1][2] = 19712 b[110][1][1] = 19713 b[110][1][0] = 19714 
c    b[110][2][2] = 19715 b[110][2][1] = 19716 b[110][2][0] = 19717 
c    b[110][3][2] = 19718 b[110][3][1] = 19719 b[110][3][0] = 19720 
c    b[110][4][2] = 19721 b[110][4][1] = 19722 b[110][4][0] = 19723 
c    b[110][5][2] = 19724 b[110][5][1] = 19725 b[110][5][0] = 19726 
c    b[110][6][2] = 19727 b[110][6][1] = 19728 b[110][6][0] = 19729 
c    b[110][7][2] = 19730 b[110][7][1] = 19731 b[110][7][0] = 19732 
c    b[110][8][2] = 19733 b[110][8][1] = 19734 b[110][8][0] = 19735 
c    b[110][9][2] = 19736 b[110][9][1] = 19737 b[110][9][0] = 19738 
c    b[110][10][2] = 19739 b[110][10][1] = 19740 b[110][10][0] = 19741 
c    b[110][11][2] = 19742 b[110][11][1] = 19743 b[110][11][0] = 19744 

c    b[111][1][2] = 19745 b[111][1][1] = 19746 b[111][1][0] = 19747 
c    b[111][2][2] = 19748 b[111][2][1] = 19749 b[111][2][0] = 19750 
c    b[111][3][2] = 19751 b[111][3][1] = 19752 b[111][3][0] = 19753 
c    b[111][4][2] = 19754 b[111][4][1] = 19755 b[111][4][0] = 19756 
c    b[111][5][2] = 19757 b[111][5][1] = 19758 b[111][5][0] = 19759 
c    b[111][6][2] = 19760 b[111][6][1] = 19761 b[111][6][0] = 19762 
c    b[111][7][2] = 19763 b[111][7][1] = 19764 b[111][7][0] = 19765 
c    b[111][8][2] = 19766 b[111][8][1] = 19767 b[111][8][0] = 19768 
c    b[111][9][2] = 19769 b[111][9][1] = 19770 b[111][9][0] = 19771 
c    b[111][10][2] = 19772 b[111][10][1] = 19773 b[111][10][0] = 19774 
c    b[111][11][2] = 19775 b[111][11][1] = 19776 b[111][11][0] = 19777 

c    b[112][1][2] = 19778 b[112][1][1] = 19779 b[112][1][0] = 19780 
c    b[112][2][2] = 19781 b[112][2][1] = 19782 b[112][2][0] = 19783 
c    b[112][3][2] = 19784 b[112][3][1] = 19785 b[112][3][0] = 19786 
c    b[112][4][2] = 19787 b[112][4][1] = 19788 b[112][4][0] = 19789 
c    b[112][5][2] = 19790 b[112][5][1] = 19791 b[112][5][0] = 19792 
c    b[112][6][2] = 19793 b[112][6][1] = 19794 b[112][6][0] = 19795 
c    b[112][7][2] = 19796 b[112][7][1] = 19797 b[112][7][0] = 19798 
c    b[112][8][2] = 19799 b[112][8][1] = 19800 b[112][8][0] = 19801 
c    b[112][9][2] = 19802 b[112][9][1] = 19803 b[112][9][0] = 19804 
c    b[112][10][2] = 19805 b[112][10][1] = 19806 b[112][10][0] = 19807 
c    b[112][11][2] = 19808 b[112][11][1] = 19809 b[112][11][0] = 19810 

c    b[113][1][2] = 19811 b[113][1][1] = 19812 b[113][1][0] = 19813 
c    b[113][2][2] = 19814 b[113][2][1] = 19815 b[113][2][0] = 19816 
c    b[113][3][2] = 19817 b[113][3][1] = 19818 b[113][3][0] = 19819 
c    b[113][4][2] = 19820 b[113][4][1] = 19821 b[113][4][0] = 19822 
c    b[113][5][2] = 19823 b[113][5][1] = 19824 b[113][5][0] = 19825 
c    b[113][6][2] = 19826 b[113][6][1] = 19827 b[113][6][0] = 19828 
c    b[113][7][2] = 19829 b[113][7][1] = 19830 b[113][7][0] = 19831 
c    b[113][8][2] = 19832 b[113][8][1] = 19833 b[113][8][0] = 19834 
c    b[113][9][2] = 19835 b[113][9][1] = 19836 b[113][9][0] = 19837 
c    b[113][10][2] = 19838 b[113][10][1] = 19839 b[113][10][0] = 19840 
c    b[113][11][2] = 19841 b[113][11][1] = 19842 b[113][11][0] = 19843 

c    b[114][1][2] = 19844 b[114][1][1] = 19845 b[114][1][0] = 19846 
c    b[114][2][2] = 19847 b[114][2][1] = 19848 b[114][2][0] = 19849 
c    b[114][3][2] = 19850 b[114][3][1] = 19851 b[114][3][0] = 19852 
c    b[114][4][2] = 19853 b[114][4][1] = 19854 b[114][4][0] = 19855 
c    b[114][5][2] = 19856 b[114][5][1] = 19857 b[114][5][0] = 19858 
c    b[114][6][2] = 19859 b[114][6][1] = 19860 b[114][6][0] = 19861 
c    b[114][7][2] = 19862 b[114][7][1] = 19863 b[114][7][0] = 19864 
c    b[114][8][2] = 19865 b[114][8][1] = 19866 b[114][8][0] = 19867 
c    b[114][9][2] = 19868 b[114][9][1] = 19869 b[114][9][0] = 19870 
c    b[114][10][2] = 19871 b[114][10][1] = 19872 b[114][10][0] = 19873 
c    b[114][11][2] = 19874 b[114][11][1] = 19875 b[114][11][0] = 19876 

c    b[115][1][2] = 19877 b[115][1][1] = 19878 b[115][1][0] = 19879 
c    b[115][2][2] = 19880 b[115][2][1] = 19881 b[115][2][0] = 19882 
c    b[115][3][2] = 19883 b[115][3][1] = 19884 b[115][3][0] = 19885 
c    b[115][4][2] = 19886 b[115][4][1] = 19887 b[115][4][0] = 19888 
c    b[115][5][2] = 19889 b[115][5][1] = 19890 b[115][5][0] = 19891 
c    b[115][6][2] = 19892 b[115][6][1] = 19893 b[115][6][0] = 19894 
c    b[115][7][2] = 19895 b[115][7][1] = 19896 b[115][7][0] = 19897 
c    b[115][8][2] = 19898 b[115][8][1] = 19899 b[115][8][0] = 19900 
c    b[115][9][2] = 19901 b[115][9][1] = 19902 b[115][9][0] = 19903 
c    b[115][10][2] = 19904 b[115][10][1] = 19905 b[115][10][0] = 19906 
c    b[115][11][2] = 19907 b[115][11][1] = 19908 b[115][11][0] = 19909 

c    b[116][1][2] = 19910 b[116][1][1] = 19911 b[116][1][0] = 19912 
c    b[116][2][2] = 19913 b[116][2][1] = 19914 b[116][2][0] = 19915 
c    b[116][3][2] = 19916 b[116][3][1] = 19917 b[116][3][0] = 19918 
c    b[116][4][2] = 19919 b[116][4][1] = 19920 b[116][4][0] = 19921 
c    b[116][5][2] = 19922 b[116][5][1] = 19923 b[116][5][0] = 19924 
c    b[116][6][2] = 19925 b[116][6][1] = 19926 b[116][6][0] = 19927 
c    b[116][7][2] = 19928 b[116][7][1] = 19929 b[116][7][0] = 19930 
c    b[116][8][2] = 19931 b[116][8][1] = 19932 b[116][8][0] = 19933 
c    b[116][9][2] = 19934 b[116][9][1] = 19935 b[116][9][0] = 19936 
c    b[116][10][2] = 19937 b[116][10][1] = 19938 b[116][10][0] = 19939 
c    b[116][11][2] = 19940 b[116][11][1] = 19941 b[116][11][0] = 19942 

c    b[117][1][2] = 19943 b[117][1][1] = 19944 b[117][1][0] = 19945 
c    b[117][2][2] = 19946 b[117][2][1] = 19947 b[117][2][0] = 19948 
c    b[117][3][2] = 19949 b[117][3][1] = 19950 b[117][3][0] = 19951 
c    b[117][4][2] = 19952 b[117][4][1] = 19953 b[117][4][0] = 19954 
c    b[117][5][2] = 19955 b[117][5][1] = 19956 b[117][5][0] = 19957 
c    b[117][6][2] = 19958 b[117][6][1] = 19959 b[117][6][0] = 19960 
c    b[117][7][2] = 19961 b[117][7][1] = 19962 b[117][7][0] = 19963 
c    b[117][8][2] = 19964 b[117][8][1] = 19965 b[117][8][0] = 19966 
c    b[117][9][2] = 19967 b[117][9][1] = 19968 b[117][9][0] = 19969 
c    b[117][10][2] = 19970 b[117][10][1] = 19971 b[117][10][0] = 19972 

c    b[118][1][2] = 19973 b[118][1][1] = 19974 b[118][1][0] = 19975 
c    b[118][2][2] = 19976 b[118][2][1] = 19977 b[118][2][0] = 19978 
c    b[118][3][2] = 19979 b[118][3][1] = 19980 b[118][3][0] = 19981 
c    b[118][4][2] = 19982 b[118][4][1] = 19983 b[118][4][0] = 19984 
c    b[118][5][2] = 19985 b[118][5][1] = 19986 b[118][5][0] = 19987 
c    b[118][6][2] = 19988 b[118][6][1] = 19989 b[118][6][0] = 19990 
c    b[118][7][2] = 19991 b[118][7][1] = 19992 b[118][7][0] = 19993 
c    b[118][8][2] = 19994 b[118][8][1] = 19995 b[118][8][0] = 19996 
c    b[118][9][2] = 19997 b[118][9][1] = 19998 b[118][9][0] = 19999 
c    b[118][10][2] = 20000 b[118][10][1] = 20001 b[118][10][0] = 20002 

c    b[119][1][2] = 20003 b[119][1][1] = 20004 b[119][1][0] = 20005 
c    b[119][2][2] = 20006 b[119][2][1] = 20007 b[119][2][0] = 20008 
c    b[119][3][2] = 20009 b[119][3][1] = 20010 b[119][3][0] = 20011 
c    b[119][4][2] = 20012 b[119][4][1] = 20013 b[119][4][0] = 20014 
c    b[119][5][2] = 20015 b[119][5][1] = 20016 b[119][5][0] = 20017 
c    b[119][6][2] = 20018 b[119][6][1] = 20019 b[119][6][0] = 20020 
c    b[119][7][2] = 20021 b[119][7][1] = 20022 b[119][7][0] = 20023 
c    b[119][8][2] = 20024 b[119][8][1] = 20025 b[119][8][0] = 20026 
c    b[119][9][2] = 20027 b[119][9][1] = 20028 b[119][9][0] = 20029 
c    b[119][10][2] = 20030 b[119][10][1] = 20031 b[119][10][0] = 20032 

c    b[120][1][2] = 20033 b[120][1][1] = 20034 b[120][1][0] = 20035 
c    b[120][2][2] = 20036 b[120][2][1] = 20037 b[120][2][0] = 20038 
c    b[120][3][2] = 20039 b[120][3][1] = 20040 b[120][3][0] = 20041 
c    b[120][4][2] = 20042 b[120][4][1] = 20043 b[120][4][0] = 20044 
c    b[120][5][2] = 20045 b[120][5][1] = 20046 b[120][5][0] = 20047 
c    b[120][6][2] = 20048 b[120][6][1] = 20049 b[120][6][0] = 20050 
c    b[120][7][2] = 20051 b[120][7][1] = 20052 b[120][7][0] = 20053 
c    b[120][8][2] = 20054 b[120][8][1] = 20055 b[120][8][0] = 20056 
c    b[120][9][2] = 20057 b[120][9][1] = 20058 b[120][9][0] = 20059 
c    b[120][10][2] = 20060 b[120][10][1] = 20061 b[120][10][0] = 20062 

c    b[121][1][2] = 20063 b[121][1][1] = 20064 b[121][1][0] = 20065 
c    b[121][2][2] = 20066 b[121][2][1] = 20067 b[121][2][0] = 20068 
c    b[121][3][2] = 20069 b[121][3][1] = 20070 b[121][3][0] = 20071 
c    b[121][4][2] = 20072 b[121][4][1] = 20073 b[121][4][0] = 20074 
c    b[121][5][2] = 20075 b[121][5][1] = 20076 b[121][5][0] = 20077 
c    b[121][6][2] = 20078 b[121][6][1] = 20079 b[121][6][0] = 20080 
c    b[121][7][2] = 20081 b[121][7][1] = 20082 b[121][7][0] = 20083 
c    b[121][8][2] = 20084 b[121][8][1] = 20085 b[121][8][0] = 20086 
c    b[121][9][2] = 20087 b[121][9][1] = 20088 b[121][9][0] = 20089 
c    b[121][10][2] = 20090 b[121][10][1] = 20091 b[121][10][0] = 20092 

c    b[122][1][2] = 20093 b[122][1][1] = 20094 b[122][1][0] = 20095 
c    b[122][2][2] = 20096 b[122][2][1] = 20097 b[122][2][0] = 20098 
c    b[122][3][2] = 20099 b[122][3][1] = 20100 b[122][3][0] = 20101 
c    b[122][4][2] = 20102 b[122][4][1] = 20103 b[122][4][0] = 20104 
c    b[122][5][2] = 20105 b[122][5][1] = 20106 b[122][5][0] = 20107 
c    b[122][6][2] = 20108 b[122][6][1] = 20109 b[122][6][0] = 20110 
c    b[122][7][2] = 20111 b[122][7][1] = 20112 b[122][7][0] = 20113 
c    b[122][8][2] = 20114 b[122][8][1] = 20115 b[122][8][0] = 20116 
c    b[122][9][2] = 20117 b[122][9][1] = 20118 b[122][9][0] = 20119 
c    b[122][10][2] = 20120 b[122][10][1] = 20121 b[122][10][0] = 20122 

c    b[123][1][2] = 20123 b[123][1][1] = 20124 b[123][1][0] = 20125 
c    b[123][2][2] = 20126 b[123][2][1] = 20127 b[123][2][0] = 20128 
c    b[123][3][2] = 20129 b[123][3][1] = 20130 b[123][3][0] = 20131 
c    b[123][4][2] = 20132 b[123][4][1] = 20133 b[123][4][0] = 20134 
c    b[123][5][2] = 20135 b[123][5][1] = 20136 b[123][5][0] = 20137 
c    b[123][6][2] = 20138 b[123][6][1] = 20139 b[123][6][0] = 20140 
c    b[123][7][2] = 20141 b[123][7][1] = 20142 b[123][7][0] = 20143 
c    b[123][8][2] = 20144 b[123][8][1] = 20145 b[123][8][0] = 20146 
c    b[123][9][2] = 20147 b[123][9][1] = 20148 b[123][9][0] = 20149 
c    b[123][10][2] = 20150 b[123][10][1] = 20151 b[123][10][0] = 20152 

c    b[124][1][2] = 20153 b[124][1][1] = 20154 b[124][1][0] = 20155 
c    b[124][2][2] = 20156 b[124][2][1] = 20157 b[124][2][0] = 20158 
c    b[124][3][2] = 20159 b[124][3][1] = 20160 b[124][3][0] = 20161 
c    b[124][4][2] = 20162 b[124][4][1] = 20163 b[124][4][0] = 20164 
c    b[124][5][2] = 20165 b[124][5][1] = 20166 b[124][5][0] = 20167 
c    b[124][6][2] = 20168 b[124][6][1] = 20169 b[124][6][0] = 20170 
c    b[124][7][2] = 20171 b[124][7][1] = 20172 b[124][7][0] = 20173 
c    b[124][8][2] = 20174 b[124][8][1] = 20175 b[124][8][0] = 20176 
c    b[124][9][2] = 20177 b[124][9][1] = 20178 b[124][9][0] = 20179 
c    b[124][10][2] = 20180 b[124][10][1] = 20181 b[124][10][0] = 20182 

c    b[125][1][2] = 20183 b[125][1][1] = 20184 b[125][1][0] = 20185 
c    b[125][2][2] = 20186 b[125][2][1] = 20187 b[125][2][0] = 20188 
c    b[125][3][2] = 20189 b[125][3][1] = 20190 b[125][3][0] = 20191 
c    b[125][4][2] = 20192 b[125][4][1] = 20193 b[125][4][0] = 20194 
c    b[125][5][2] = 20195 b[125][5][1] = 20196 b[125][5][0] = 20197 
c    b[125][6][2] = 20198 b[125][6][1] = 20199 b[125][6][0] = 20200 
c    b[125][7][2] = 20201 b[125][7][1] = 20202 b[125][7][0] = 20203 
c    b[125][8][2] = 20204 b[125][8][1] = 20205 b[125][8][0] = 20206 
c    b[125][9][2] = 20207 b[125][9][1] = 20208 b[125][9][0] = 20209 
c    b[125][10][2] = 20210 b[125][10][1] = 20211 b[125][10][0] = 20212 

c    b[126][1][2] = 20213 b[126][1][1] = 20214 b[126][1][0] = 20215 
c    b[126][2][2] = 20216 b[126][2][1] = 20217 b[126][2][0] = 20218 
c    b[126][3][2] = 20219 b[126][3][1] = 20220 b[126][3][0] = 20221 
c    b[126][4][2] = 20222 b[126][4][1] = 20223 b[126][4][0] = 20224 
c    b[126][5][2] = 20225 b[126][5][1] = 20226 b[126][5][0] = 20227 
c    b[126][6][2] = 20228 b[126][6][1] = 20229 b[126][6][0] = 20230 
c    b[126][7][2] = 20231 b[126][7][1] = 20232 b[126][7][0] = 20233 
c    b[126][8][2] = 20234 b[126][8][1] = 20235 b[126][8][0] = 20236 
c    b[126][9][2] = 20237 b[126][9][1] = 20238 b[126][9][0] = 20239 
c    b[126][10][2] = 20240 b[126][10][1] = 20241 b[126][10][0] = 20242 

c    b[127][1][2] = 20243 b[127][1][1] = 20244 b[127][1][0] = 20245 
c    b[127][2][2] = 20246 b[127][2][1] = 20247 b[127][2][0] = 20248 
c    b[127][3][2] = 20249 b[127][3][1] = 20250 b[127][3][0] = 20251 
c    b[127][4][2] = 20252 b[127][4][1] = 20253 b[127][4][0] = 20254 
c    b[127][5][2] = 20255 b[127][5][1] = 20256 b[127][5][0] = 20257 
c    b[127][6][2] = 20258 b[127][6][1] = 20259 b[127][6][0] = 20260 
c    b[127][7][2] = 20261 b[127][7][1] = 20262 b[127][7][0] = 20263 
c    b[127][8][2] = 20264 b[127][8][1] = 20265 b[127][8][0] = 20266 
c    b[127][9][2] = 20267 b[127][9][1] = 20268 b[127][9][0] = 20269 
c    b[127][10][2] = 20270 b[127][10][1] = 20271 b[127][10][0] = 20272 

c    b[128][1][2] = 20273 b[128][1][1] = 20274 b[128][1][0] = 20275 
c    b[128][2][2] = 20276 b[128][2][1] = 20277 b[128][2][0] = 20278 
c    b[128][3][2] = 20279 b[128][3][1] = 20280 b[128][3][0] = 20281 
c    b[128][4][2] = 20282 b[128][4][1] = 20283 b[128][4][0] = 20284 
c    b[128][5][2] = 20285 b[128][5][1] = 20286 b[128][5][0] = 20287 
c    b[128][6][2] = 20288 b[128][6][1] = 20289 b[128][6][0] = 20290 
c    b[128][7][2] = 20291 b[128][7][1] = 20292 b[128][7][0] = 20293 
c    b[128][8][2] = 20294 b[128][8][1] = 20295 b[128][8][0] = 20296 
c    b[128][9][2] = 20297 b[128][9][1] = 20298 b[128][9][0] = 20299 
c    b[128][10][2] = 20300 b[128][10][1] = 20301 b[128][10][0] = 20302 

c    b[129][1][2] = 20303 b[129][1][1] = 20304 b[129][1][0] = 20305 
c    b[129][2][2] = 20306 b[129][2][1] = 20307 b[129][2][0] = 20308 
c    b[129][3][2] = 20309 b[129][3][1] = 20310 b[129][3][0] = 20311 
c    b[129][4][2] = 20312 b[129][4][1] = 20313 b[129][4][0] = 20314 
c    b[129][5][2] = 20315 b[129][5][1] = 20316 b[129][5][0] = 20317 
c    b[129][6][2] = 20318 b[129][6][1] = 20319 b[129][6][0] = 20320 
c    b[129][7][2] = 20321 b[129][7][1] = 20322 b[129][7][0] = 20323 
c    b[129][8][2] = 20324 b[129][8][1] = 20325 b[129][8][0] = 20326 
c    b[129][9][2] = 20327 b[129][9][1] = 20328 b[129][9][0] = 20329 
c    b[129][10][2] = 20330 b[129][10][1] = 20331 b[129][10][0] = 20332 

c    b[130][1][2] = 20333 b[130][1][1] = 20334 b[130][1][0] = 20335 
c    b[130][2][2] = 20336 b[130][2][1] = 20337 b[130][2][0] = 20338 
c    b[130][3][2] = 20339 b[130][3][1] = 20340 b[130][3][0] = 20341 
c    b[130][4][2] = 20342 b[130][4][1] = 20343 b[130][4][0] = 20344 
c    b[130][5][2] = 20345 b[130][5][1] = 20346 b[130][5][0] = 20347 
c    b[130][6][2] = 20348 b[130][6][1] = 20349 b[130][6][0] = 20350 
c    b[130][7][2] = 20351 b[130][7][1] = 20352 b[130][7][0] = 20353 
c    b[130][8][2] = 20354 b[130][8][1] = 20355 b[130][8][0] = 20356 
c    b[130][9][2] = 20357 b[130][9][1] = 20358 b[130][9][0] = 20359 

c    b[131][1][2] = 20360 b[131][1][1] = 20361 b[131][1][0] = 20362 
c    b[131][2][2] = 20363 b[131][2][1] = 20364 b[131][2][0] = 20365 
c    b[131][3][2] = 20366 b[131][3][1] = 20367 b[131][3][0] = 20368 
c    b[131][4][2] = 20369 b[131][4][1] = 20370 b[131][4][0] = 20371 
c    b[131][5][2] = 20372 b[131][5][1] = 20373 b[131][5][0] = 20374 
c    b[131][6][2] = 20375 b[131][6][1] = 20376 b[131][6][0] = 20377 
c    b[131][7][2] = 20378 b[131][7][1] = 20379 b[131][7][0] = 20380 
c    b[131][8][2] = 20381 b[131][8][1] = 20382 b[131][8][0] = 20383 
c    b[131][9][2] = 20384 b[131][9][1] = 20385 b[131][9][0] = 20386 

c    b[132][1][2] = 20387 b[132][1][1] = 20388 b[132][1][0] = 20389 
c    b[132][2][2] = 20390 b[132][2][1] = 20391 b[132][2][0] = 20392 
c    b[132][3][2] = 20393 b[132][3][1] = 20394 b[132][3][0] = 20395 
c    b[132][4][2] = 20396 b[132][4][1] = 20397 b[132][4][0] = 20398 
c    b[132][5][2] = 20399 b[132][5][1] = 20400 b[132][5][0] = 20401 
c    b[132][6][2] = 20402 b[132][6][1] = 20403 b[132][6][0] = 20404 
c    b[132][7][2] = 20405 b[132][7][1] = 20406 b[132][7][0] = 20407 
c    b[132][8][2] = 20408 b[132][8][1] = 20409 b[132][8][0] = 20410 
c    b[132][9][2] = 20411 b[132][9][1] = 20412 b[132][9][0] = 20413 

c    b[133][1][2] = 20414 b[133][1][1] = 20415 b[133][1][0] = 20416 
c    b[133][2][2] = 20417 b[133][2][1] = 20418 b[133][2][0] = 20419 
c    b[133][3][2] = 20420 b[133][3][1] = 20421 b[133][3][0] = 20422 
c    b[133][4][2] = 20423 b[133][4][1] = 20424 b[133][4][0] = 20425 
c    b[133][5][2] = 20426 b[133][5][1] = 20427 b[133][5][0] = 20428 
c    b[133][6][2] = 20429 b[133][6][1] = 20430 b[133][6][0] = 20431 
c    b[133][7][2] = 20432 b[133][7][1] = 20433 b[133][7][0] = 20434 
c    b[133][8][2] = 20435 b[133][8][1] = 20436 b[133][8][0] = 20437 
c    b[133][9][2] = 20438 b[133][9][1] = 20439 b[133][9][0] = 20440 

c    b[134][1][2] = 20441 b[134][1][1] = 20442 b[134][1][0] = 20443 
c    b[134][2][2] = 20444 b[134][2][1] = 20445 b[134][2][0] = 20446 
c    b[134][3][2] = 20447 b[134][3][1] = 20448 b[134][3][0] = 20449 
c    b[134][4][2] = 20450 b[134][4][1] = 20451 b[134][4][0] = 20452 
c    b[134][5][2] = 20453 b[134][5][1] = 20454 b[134][5][0] = 20455 
c    b[134][6][2] = 20456 b[134][6][1] = 20457 b[134][6][0] = 20458 
c    b[134][7][2] = 20459 b[134][7][1] = 20460 b[134][7][0] = 20461 
c    b[134][8][2] = 20462 b[134][8][1] = 20463 b[134][8][0] = 20464 
c    b[134][9][2] = 20465 b[134][9][1] = 20466 b[134][9][0] = 20467 

c    b[135][1][2] = 20468 b[135][1][1] = 20469 b[135][1][0] = 20470 
c    b[135][2][2] = 20471 b[135][2][1] = 20472 b[135][2][0] = 20473 
c    b[135][3][2] = 20474 b[135][3][1] = 20475 b[135][3][0] = 20476 
c    b[135][4][2] = 20477 b[135][4][1] = 20478 b[135][4][0] = 20479 
c    b[135][5][2] = 20480 b[135][5][1] = 20481 b[135][5][0] = 20482 
c    b[135][6][2] = 20483 b[135][6][1] = 20484 b[135][6][0] = 20485 
c    b[135][7][2] = 20486 b[135][7][1] = 20487 b[135][7][0] = 20488 
c    b[135][8][2] = 20489 b[135][8][1] = 20490 b[135][8][0] = 20491 
c    b[135][9][2] = 20492 b[135][9][1] = 20493 b[135][9][0] = 20494 

c    b[136][1][2] = 20495 b[136][1][1] = 20496 b[136][1][0] = 20497 
c    b[136][2][2] = 20498 b[136][2][1] = 20499 b[136][2][0] = 20500 
c    b[136][3][2] = 20501 b[136][3][1] = 20502 b[136][3][0] = 20503 
c    b[136][4][2] = 20504 b[136][4][1] = 20505 b[136][4][0] = 20506 
c    b[136][5][2] = 20507 b[136][5][1] = 20508 b[136][5][0] = 20509 
c    b[136][6][2] = 20510 b[136][6][1] = 20511 b[136][6][0] = 20512 
c    b[136][7][2] = 20513 b[136][7][1] = 20514 b[136][7][0] = 20515 
c    b[136][8][2] = 20516 b[136][8][1] = 20517 b[136][8][0] = 20518 
c    b[136][9][2] = 20519 b[136][9][1] = 20520 b[136][9][0] = 20521 

c    b[137][1][2] = 20522 b[137][1][1] = 20523 b[137][1][0] = 20524 
c    b[137][2][2] = 20525 b[137][2][1] = 20526 b[137][2][0] = 20527 
c    b[137][3][2] = 20528 b[137][3][1] = 20529 b[137][3][0] = 20530 
c    b[137][4][2] = 20531 b[137][4][1] = 20532 b[137][4][0] = 20533 
c    b[137][5][2] = 20534 b[137][5][1] = 20535 b[137][5][0] = 20536 
c    b[137][6][2] = 20537 b[137][6][1] = 20538 b[137][6][0] = 20539 
c    b[137][7][2] = 20540 b[137][7][1] = 20541 b[137][7][0] = 20542 
c    b[137][8][2] = 20543 b[137][8][1] = 20544 b[137][8][0] = 20545 
c    b[137][9][2] = 20546 b[137][9][1] = 20547 b[137][9][0] = 20548 

c    b[138][1][2] = 20549 b[138][1][1] = 20550 b[138][1][0] = 20551 
c    b[138][2][2] = 20552 b[138][2][1] = 20553 b[138][2][0] = 20554 
c    b[138][3][2] = 20555 b[138][3][1] = 20556 b[138][3][0] = 20557 
c    b[138][4][2] = 20558 b[138][4][1] = 20559 b[138][4][0] = 20560 
c    b[138][5][2] = 20561 b[138][5][1] = 20562 b[138][5][0] = 20563 
c    b[138][6][2] = 20564 b[138][6][1] = 20565 b[138][6][0] = 20566 
c    b[138][7][2] = 20567 b[138][7][1] = 20568 b[138][7][0] = 20569 
c    b[138][8][2] = 20570 b[138][8][1] = 20571 b[138][8][0] = 20572 
c    b[138][9][2] = 20573 b[138][9][1] = 20574 b[138][9][0] = 20575 

c    b[139][1][2] = 20576 b[139][1][1] = 20577 b[139][1][0] = 20578 
c    b[139][2][2] = 20579 b[139][2][1] = 20580 b[139][2][0] = 20581 
c    b[139][3][2] = 20582 b[139][3][1] = 20583 b[139][3][0] = 20584 
c    b[139][4][2] = 20585 b[139][4][1] = 20586 b[139][4][0] = 20587 
c    b[139][5][2] = 20588 b[139][5][1] = 20589 b[139][5][0] = 20590 
c    b[139][6][2] = 20591 b[139][6][1] = 20592 b[139][6][0] = 20593 
c    b[139][7][2] = 20594 b[139][7][1] = 20595 b[139][7][0] = 20596 
c    b[139][8][2] = 20597 b[139][8][1] = 20598 b[139][8][0] = 20599 
c    b[139][9][2] = 20600 b[139][9][1] = 20601 b[139][9][0] = 20602 

c    b[140][1][2] = 20603 b[140][1][1] = 20604 b[140][1][0] = 20605 
c    b[140][2][2] = 20606 b[140][2][1] = 20607 b[140][2][0] = 20608 
c    b[140][3][2] = 20609 b[140][3][1] = 20610 b[140][3][0] = 20611 
c    b[140][4][2] = 20612 b[140][4][1] = 20613 b[140][4][0] = 20614 
c    b[140][5][2] = 20615 b[140][5][1] = 20616 b[140][5][0] = 20617 
c    b[140][6][2] = 20618 b[140][6][1] = 20619 b[140][6][0] = 20620 
c    b[140][7][2] = 20621 b[140][7][1] = 20622 b[140][7][0] = 20623 
c    b[140][8][2] = 20624 b[140][8][1] = 20625 b[140][8][0] = 20626 
c    b[140][9][2] = 20627 b[140][9][1] = 20628 b[140][9][0] = 20629 

c    b[141][1][2] = 20630 b[141][1][1] = 20631 b[141][1][0] = 20632 
c    b[141][2][2] = 20633 b[141][2][1] = 20634 b[141][2][0] = 20635 
c    b[141][3][2] = 20636 b[141][3][1] = 20637 b[141][3][0] = 20638 
c    b[141][4][2] = 20639 b[141][4][1] = 20640 b[141][4][0] = 20641 
c    b[141][5][2] = 20642 b[141][5][1] = 20643 b[141][5][0] = 20644 
c    b[141][6][2] = 20645 b[141][6][1] = 20646 b[141][6][0] = 20647 
c    b[141][7][2] = 20648 b[141][7][1] = 20649 b[141][7][0] = 20650 
c    b[141][8][2] = 20651 b[141][8][1] = 20652 b[141][8][0] = 20653 
c    b[141][9][2] = 20654 b[141][9][1] = 20655 b[141][9][0] = 20656 

c    b[142][1][2] = 20657 b[142][1][1] = 20658 b[142][1][0] = 20659 
c    b[142][2][2] = 20660 b[142][2][1] = 20661 b[142][2][0] = 20662 
c    b[142][3][2] = 20663 b[142][3][1] = 20664 b[142][3][0] = 20665 
c    b[142][4][2] = 20666 b[142][4][1] = 20667 b[142][4][0] = 20668 
c    b[142][5][2] = 20669 b[142][5][1] = 20670 b[142][5][0] = 20671 
c    b[142][6][2] = 20672 b[142][6][1] = 20673 b[142][6][0] = 20674 
c    b[142][7][2] = 20675 b[142][7][1] = 20676 b[142][7][0] = 20677 
c    b[142][8][2] = 20678 b[142][8][1] = 20679 b[142][8][0] = 20680 
c    b[142][9][2] = 20681 b[142][9][1] = 20682 b[142][9][0] = 20683 

c    b[143][1][2] = 20684 b[143][1][1] = 20685 b[143][1][0] = 20686 
c    b[143][2][2] = 20687 b[143][2][1] = 20688 b[143][2][0] = 20689 
c    b[143][3][2] = 20690 b[143][3][1] = 20691 b[143][3][0] = 20692 
c    b[143][4][2] = 20693 b[143][4][1] = 20694 b[143][4][0] = 20695 
c    b[143][5][2] = 20696 b[143][5][1] = 20697 b[143][5][0] = 20698 
c    b[143][6][2] = 20699 b[143][6][1] = 20700 b[143][6][0] = 20701 
c    b[143][7][2] = 20702 b[143][7][1] = 20703 b[143][7][0] = 20704 
c    b[143][8][2] = 20705 b[143][8][1] = 20706 b[143][8][0] = 20707 
c    b[143][9][2] = 20708 b[143][9][1] = 20709 b[143][9][0] = 20710 

c    b[144][1][2] = 20711 b[144][1][1] = 20712 b[144][1][0] = 20713 
c    b[144][2][2] = 20714 b[144][2][1] = 20715 b[144][2][0] = 20716 
c    b[144][3][2] = 20717 b[144][3][1] = 20718 b[144][3][0] = 20719 
c    b[144][4][2] = 20720 b[144][4][1] = 20721 b[144][4][0] = 20722 
c    b[144][5][2] = 20723 b[144][5][1] = 20724 b[144][5][0] = 20725 
c    b[144][6][2] = 20726 b[144][6][1] = 20727 b[144][6][0] = 20728 
c    b[144][7][2] = 20729 b[144][7][1] = 20730 b[144][7][0] = 20731 
c    b[144][8][2] = 20732 b[144][8][1] = 20733 b[144][8][0] = 20734 
c    b[144][9][2] = 20735 b[144][9][1] = 20736 b[144][9][0] = 20737 

c    b[145][1][2] = 20738 b[145][1][1] = 20739 b[145][1][0] = 20740 
c    b[145][2][2] = 20741 b[145][2][1] = 20742 b[145][2][0] = 20743 
c    b[145][3][2] = 20744 b[145][3][1] = 20745 b[145][3][0] = 20746 
c    b[145][4][2] = 20747 b[145][4][1] = 20748 b[145][4][0] = 20749 
c    b[145][5][2] = 20750 b[145][5][1] = 20751 b[145][5][0] = 20752 
c    b[145][6][2] = 20753 b[145][6][1] = 20754 b[145][6][0] = 20755 
c    b[145][7][2] = 20756 b[145][7][1] = 20757 b[145][7][0] = 20758 
c    b[145][8][2] = 20759 b[145][8][1] = 20760 b[145][8][0] = 20761 
c    b[145][9][2] = 20762 b[145][9][1] = 20763 b[145][9][0] = 20764 

c    b[146][1][2] = 20765 b[146][1][1] = 20766 b[146][1][0] = 20767 
c    b[146][2][2] = 20768 b[146][2][1] = 20769 b[146][2][0] = 20770 
c    b[146][3][2] = 20771 b[146][3][1] = 20772 b[146][3][0] = 20773 
c    b[146][4][2] = 20774 b[146][4][1] = 20775 b[146][4][0] = 20776 
c    b[146][5][2] = 20777 b[146][5][1] = 20778 b[146][5][0] = 20779 
c    b[146][6][2] = 20780 b[146][6][1] = 20781 b[146][6][0] = 20782 
c    b[146][7][2] = 20783 b[146][7][1] = 20784 b[146][7][0] = 20785 
c    b[146][8][2] = 20786 b[146][8][1] = 20787 b[146][8][0] = 20788 

c    b[147][1][2] = 20789 b[147][1][1] = 20790 b[147][1][0] = 20791 
c    b[147][2][2] = 20792 b[147][2][1] = 20793 b[147][2][0] = 20794 
c    b[147][3][2] = 20795 b[147][3][1] = 20796 b[147][3][0] = 20797 
c    b[147][4][2] = 20798 b[147][4][1] = 20799 b[147][4][0] = 20800 
c    b[147][5][2] = 20801 b[147][5][1] = 20802 b[147][5][0] = 20803 
c    b[147][6][2] = 20804 b[147][6][1] = 20805 b[147][6][0] = 20806 
c    b[147][7][2] = 20807 b[147][7][1] = 20808 b[147][7][0] = 20809 
c    b[147][8][2] = 20810 b[147][8][1] = 20811 b[147][8][0] = 20812 

c    b[148][1][2] = 20813 b[148][1][1] = 20814 b[148][1][0] = 20815 
c    b[148][2][2] = 20816 b[148][2][1] = 20817 b[148][2][0] = 20818 
c    b[148][3][2] = 20819 b[148][3][1] = 20820 b[148][3][0] = 20821 
c    b[148][4][2] = 20822 b[148][4][1] = 20823 b[148][4][0] = 20824 
c    b[148][5][2] = 20825 b[148][5][1] = 20826 b[148][5][0] = 20827 
c    b[148][6][2] = 20828 b[148][6][1] = 20829 b[148][6][0] = 20830 
c    b[148][7][2] = 20831 b[148][7][1] = 20832 b[148][7][0] = 20833 
c    b[148][8][2] = 20834 b[148][8][1] = 20835 b[148][8][0] = 20836 

c    b[149][1][2] = 20837 b[149][1][1] = 20838 b[149][1][0] = 20839 
c    b[149][2][2] = 20840 b[149][2][1] = 20841 b[149][2][0] = 20842 
c    b[149][3][2] = 20843 b[149][3][1] = 20844 b[149][3][0] = 20845 
c    b[149][4][2] = 20846 b[149][4][1] = 20847 b[149][4][0] = 20848 
c    b[149][5][2] = 20849 b[149][5][1] = 20850 b[149][5][0] = 20851 
c    b[149][6][2] = 20852 b[149][6][1] = 20853 b[149][6][0] = 20854 
c    b[149][7][2] = 20855 b[149][7][1] = 20856 b[149][7][0] = 20857 
c    b[149][8][2] = 20858 b[149][8][1] = 20859 b[149][8][0] = 20860 

c    b[150][1][2] = 20861 b[150][1][1] = 20862 b[150][1][0] = 20863 
c    b[150][2][2] = 20864 b[150][2][1] = 20865 b[150][2][0] = 20866 
c    b[150][3][2] = 20867 b[150][3][1] = 20868 b[150][3][0] = 20869 
c    b[150][4][2] = 20870 b[150][4][1] = 20871 b[150][4][0] = 20872 
c    b[150][5][2] = 20873 b[150][5][1] = 20874 b[150][5][0] = 20875 
c    b[150][6][2] = 20876 b[150][6][1] = 20877 b[150][6][0] = 20878 
c    b[150][7][2] = 20879 b[150][7][1] = 20880 b[150][7][0] = 20881 
c    b[150][8][2] = 20882 b[150][8][1] = 20883 b[150][8][0] = 20884 

c    b[151][1][2] = 20885 b[151][1][1] = 20886 b[151][1][0] = 20887 
c    b[151][2][2] = 20888 b[151][2][1] = 20889 b[151][2][0] = 20890 
c    b[151][3][2] = 20891 b[151][3][1] = 20892 b[151][3][0] = 20893 
c    b[151][4][2] = 20894 b[151][4][1] = 20895 b[151][4][0] = 20896 
c    b[151][5][2] = 20897 b[151][5][1] = 20898 b[151][5][0] = 20899 
c    b[151][6][2] = 20900 b[151][6][1] = 20901 b[151][6][0] = 20902 
c    b[151][7][2] = 20903 b[151][7][1] = 20904 b[151][7][0] = 20905 
c    b[151][8][2] = 20906 b[151][8][1] = 20907 b[151][8][0] = 20908 

c    b[152][1][2] = 20909 b[152][1][1] = 20910 b[152][1][0] = 20911 
c    b[152][2][2] = 20912 b[152][2][1] = 20913 b[152][2][0] = 20914 
c    b[152][3][2] = 20915 b[152][3][1] = 20916 b[152][3][0] = 20917 
c    b[152][4][2] = 20918 b[152][4][1] = 20919 b[152][4][0] = 20920 
c    b[152][5][2] = 20921 b[152][5][1] = 20922 b[152][5][0] = 20923 
c    b[152][6][2] = 20924 b[152][6][1] = 20925 b[152][6][0] = 20926 
c    b[152][7][2] = 20927 b[152][7][1] = 20928 b[152][7][0] = 20929 
c    b[152][8][2] = 20930 b[152][8][1] = 20931 b[152][8][0] = 20932 

c    b[153][1][2] = 20933 b[153][1][1] = 20934 b[153][1][0] = 20935 
c    b[153][2][2] = 20936 b[153][2][1] = 20937 b[153][2][0] = 20938 
c    b[153][3][2] = 20939 b[153][3][1] = 20940 b[153][3][0] = 20941 
c    b[153][4][2] = 20942 b[153][4][1] = 20943 b[153][4][0] = 20944 
c    b[153][5][2] = 20945 b[153][5][1] = 20946 b[153][5][0] = 20947 
c    b[153][6][2] = 20948 b[153][6][1] = 20949 b[153][6][0] = 20950 
c    b[153][7][2] = 20951 b[153][7][1] = 20952 b[153][7][0] = 20953 
c    b[153][8][2] = 20954 b[153][8][1] = 20955 b[153][8][0] = 20956 

c    b[154][1][2] = 20957 b[154][1][1] = 20958 b[154][1][0] = 20959 
c    b[154][2][2] = 20960 b[154][2][1] = 20961 b[154][2][0] = 20962 
c    b[154][3][2] = 20963 b[154][3][1] = 20964 b[154][3][0] = 20965 
c    b[154][4][2] = 20966 b[154][4][1] = 20967 b[154][4][0] = 20968 
c    b[154][5][2] = 20969 b[154][5][1] = 20970 b[154][5][0] = 20971 
c    b[154][6][2] = 20972 b[154][6][1] = 20973 b[154][6][0] = 20974 
c    b[154][7][2] = 20975 b[154][7][1] = 20976 b[154][7][0] = 20977 
c    b[154][8][2] = 20978 b[154][8][1] = 20979 b[154][8][0] = 20980 

c    b[155][1][2] = 20981 b[155][1][1] = 20982 b[155][1][0] = 20983 
c    b[155][2][2] = 20984 b[155][2][1] = 20985 b[155][2][0] = 20986 
c    b[155][3][2] = 20987 b[155][3][1] = 20988 b[155][3][0] = 20989 
c    b[155][4][2] = 20990 b[155][4][1] = 20991 b[155][4][0] = 20992 
c    b[155][5][2] = 20993 b[155][5][1] = 20994 b[155][5][0] = 20995 
c    b[155][6][2] = 20996 b[155][6][1] = 20997 b[155][6][0] = 20998 
c    b[155][7][2] = 20999 b[155][7][1] = 21000 b[155][7][0] = 21001 
c    b[155][8][2] = 21002 b[155][8][1] = 21003 b[155][8][0] = 21004 

c    b[156][1][2] = 21005 b[156][1][1] = 21006 b[156][1][0] = 21007 
c    b[156][2][2] = 21008 b[156][2][1] = 21009 b[156][2][0] = 21010 
c    b[156][3][2] = 21011 b[156][3][1] = 21012 b[156][3][0] = 21013 
c    b[156][4][2] = 21014 b[156][4][1] = 21015 b[156][4][0] = 21016 
c    b[156][5][2] = 21017 b[156][5][1] = 21018 b[156][5][0] = 21019 
c    b[156][6][2] = 21020 b[156][6][1] = 21021 b[156][6][0] = 21022 
c    b[156][7][2] = 21023 b[156][7][1] = 21024 b[156][7][0] = 21025 
c    b[156][8][2] = 21026 b[156][8][1] = 21027 b[156][8][0] = 21028 

c    b[157][1][2] = 21029 b[157][1][1] = 21030 b[157][1][0] = 21031 
c    b[157][2][2] = 21032 b[157][2][1] = 21033 b[157][2][0] = 21034 
c    b[157][3][2] = 21035 b[157][3][1] = 21036 b[157][3][0] = 21037 
c    b[157][4][2] = 21038 b[157][4][1] = 21039 b[157][4][0] = 21040 
c    b[157][5][2] = 21041 b[157][5][1] = 21042 b[157][5][0] = 21043 
c    b[157][6][2] = 21044 b[157][6][1] = 21045 b[157][6][0] = 21046 
c    b[157][7][2] = 21047 b[157][7][1] = 21048 b[157][7][0] = 21049 
c    b[157][8][2] = 21050 b[157][8][1] = 21051 b[157][8][0] = 21052 

c    b[158][1][2] = 21053 b[158][1][1] = 21054 b[158][1][0] = 21055 
c    b[158][2][2] = 21056 b[158][2][1] = 21057 b[158][2][0] = 21058 
c    b[158][3][2] = 21059 b[158][3][1] = 21060 b[158][3][0] = 21061 
c    b[158][4][2] = 21062 b[158][4][1] = 21063 b[158][4][0] = 21064 
c    b[158][5][2] = 21065 b[158][5][1] = 21066 b[158][5][0] = 21067 
c    b[158][6][2] = 21068 b[158][6][1] = 21069 b[158][6][0] = 21070 
c    b[158][7][2] = 21071 b[158][7][1] = 21072 b[158][7][0] = 21073 
c    b[158][8][2] = 21074 b[158][8][1] = 21075 b[158][8][0] = 21076 

c    b[159][1][2] = 21077 b[159][1][1] = 21078 b[159][1][0] = 21079 
c    b[159][2][2] = 21080 b[159][2][1] = 21081 b[159][2][0] = 21082 
c    b[159][3][2] = 21083 b[159][3][1] = 21084 b[159][3][0] = 21085 
c    b[159][4][2] = 21086 b[159][4][1] = 21087 b[159][4][0] = 21088 
c    b[159][5][2] = 21089 b[159][5][1] = 21090 b[159][5][0] = 21091 
c    b[159][6][2] = 21092 b[159][6][1] = 21093 b[159][6][0] = 21094 
c    b[159][7][2] = 21095 b[159][7][1] = 21096 b[159][7][0] = 21097 
c    b[159][8][2] = 21098 b[159][8][1] = 21099 b[159][8][0] = 21100 

c    b[160][1][2] = 21101 b[160][1][1] = 21102 b[160][1][0] = 21103 
c    b[160][2][2] = 21104 b[160][2][1] = 21105 b[160][2][0] = 21106 
c    b[160][3][2] = 21107 b[160][3][1] = 21108 b[160][3][0] = 21109 
c    b[160][4][2] = 21110 b[160][4][1] = 21111 b[160][4][0] = 21112 
c    b[160][5][2] = 21113 b[160][5][1] = 21114 b[160][5][0] = 21115 
c    b[160][6][2] = 21116 b[160][6][1] = 21117 b[160][6][0] = 21118 
c    b[160][7][2] = 21119 b[160][7][1] = 21120 b[160][7][0] = 21121 
c    b[160][8][2] = 21122 b[160][8][1] = 21123 b[160][8][0] = 21124 

c    b[161][1][2] = 21125 b[161][1][1] = 21126 b[161][1][0] = 21127 
c    b[161][2][2] = 21128 b[161][2][1] = 21129 b[161][2][0] = 21130 
c    b[161][3][2] = 21131 b[161][3][1] = 21132 b[161][3][0] = 21133 
c    b[161][4][2] = 21134 b[161][4][1] = 21135 b[161][4][0] = 21136 
c    b[161][5][2] = 21137 b[161][5][1] = 21138 b[161][5][0] = 21139 
c    b[161][6][2] = 21140 b[161][6][1] = 21141 b[161][6][0] = 21142 
c    b[161][7][2] = 21143 b[161][7][1] = 21144 b[161][7][0] = 21145 
c    b[161][8][2] = 21146 b[161][8][1] = 21147 b[161][8][0] = 21148 

c    b[162][1][2] = 21149 b[162][1][1] = 21150 b[162][1][0] = 21151 
c    b[162][2][2] = 21152 b[162][2][1] = 21153 b[162][2][0] = 21154 
c    b[162][3][2] = 21155 b[162][3][1] = 21156 b[162][3][0] = 21157 
c    b[162][4][2] = 21158 b[162][4][1] = 21159 b[162][4][0] = 21160 
c    b[162][5][2] = 21161 b[162][5][1] = 21162 b[162][5][0] = 21163 
c    b[162][6][2] = 21164 b[162][6][1] = 21165 b[162][6][0] = 21166 
c    b[162][7][2] = 21167 b[162][7][1] = 21168 b[162][7][0] = 21169 
c    b[162][8][2] = 21170 b[162][8][1] = 21171 b[162][8][0] = 21172 

c    b[163][1][2] = 21173 b[163][1][1] = 21174 b[163][1][0] = 21175 
c    b[163][2][2] = 21176 b[163][2][1] = 21177 b[163][2][0] = 21178 
c    b[163][3][2] = 21179 b[163][3][1] = 21180 b[163][3][0] = 21181 
c    b[163][4][2] = 21182 b[163][4][1] = 21183 b[163][4][0] = 21184 
c    b[163][5][2] = 21185 b[163][5][1] = 21186 b[163][5][0] = 21187 
c    b[163][6][2] = 21188 b[163][6][1] = 21189 b[163][6][0] = 21190 
c    b[163][7][2] = 21191 b[163][7][1] = 21192 b[163][7][0] = 21193 
c    b[163][8][2] = 21194 b[163][8][1] = 21195 b[163][8][0] = 21196 

c    b[164][1][2] = 21197 b[164][1][1] = 21198 b[164][1][0] = 21199 
c    b[164][2][2] = 21200 b[164][2][1] = 21201 b[164][2][0] = 21202 
c    b[164][3][2] = 21203 b[164][3][1] = 21204 b[164][3][0] = 21205 
c    b[164][4][2] = 21206 b[164][4][1] = 21207 b[164][4][0] = 21208 
c    b[164][5][2] = 21209 b[164][5][1] = 21210 b[164][5][0] = 21211 
c    b[164][6][2] = 21212 b[164][6][1] = 21213 b[164][6][0] = 21214 
c    b[164][7][2] = 21215 b[164][7][1] = 21216 b[164][7][0] = 21217 
c    b[164][8][2] = 21218 b[164][8][1] = 21219 b[164][8][0] = 21220 

c    b[165][1][2] = 21221 b[165][1][1] = 21222 b[165][1][0] = 21223 
c    b[165][2][2] = 21224 b[165][2][1] = 21225 b[165][2][0] = 21226 
c    b[165][3][2] = 21227 b[165][3][1] = 21228 b[165][3][0] = 21229 
c    b[165][4][2] = 21230 b[165][4][1] = 21231 b[165][4][0] = 21232 
c    b[165][5][2] = 21233 b[165][5][1] = 21234 b[165][5][0] = 21235 
c    b[165][6][2] = 21236 b[165][6][1] = 21237 b[165][6][0] = 21238 
c    b[165][7][2] = 21239 b[165][7][1] = 21240 b[165][7][0] = 21241 
c    b[165][8][2] = 21242 b[165][8][1] = 21243 b[165][8][0] = 21244 

c    b[166][1][2] = 21245 b[166][1][1] = 21246 b[166][1][0] = 21247 
c    b[166][2][2] = 21248 b[166][2][1] = 21249 b[166][2][0] = 21250 
c    b[166][3][2] = 21251 b[166][3][1] = 21252 b[166][3][0] = 21253 
c    b[166][4][2] = 21254 b[166][4][1] = 21255 b[166][4][0] = 21256 
c    b[166][5][2] = 21257 b[166][5][1] = 21258 b[166][5][0] = 21259 
c    b[166][6][2] = 21260 b[166][6][1] = 21261 b[166][6][0] = 21262 
c    b[166][7][2] = 21263 b[166][7][1] = 21264 b[166][7][0] = 21265 

c    b[167][1][2] = 21266 b[167][1][1] = 21267 b[167][1][0] = 21268 
c    b[167][2][2] = 21269 b[167][2][1] = 21270 b[167][2][0] = 21271 
c    b[167][3][2] = 21272 b[167][3][1] = 21273 b[167][3][0] = 21274 
c    b[167][4][2] = 21275 b[167][4][1] = 21276 b[167][4][0] = 21277 
c    b[167][5][2] = 21278 b[167][5][1] = 21279 b[167][5][0] = 21280 
c    b[167][6][2] = 21281 b[167][6][1] = 21282 b[167][6][0] = 21283 
c    b[167][7][2] = 21284 b[167][7][1] = 21285 b[167][7][0] = 21286 

c    b[168][1][2] = 21287 b[168][1][1] = 21288 b[168][1][0] = 21289 
c    b[168][2][2] = 21290 b[168][2][1] = 21291 b[168][2][0] = 21292 
c    b[168][3][2] = 21293 b[168][3][1] = 21294 b[168][3][0] = 21295 
c    b[168][4][2] = 21296 b[168][4][1] = 21297 b[168][4][0] = 21298 
c    b[168][5][2] = 21299 b[168][5][1] = 21300 b[168][5][0] = 21301 
c    b[168][6][2] = 21302 b[168][6][1] = 21303 b[168][6][0] = 21304 
c    b[168][7][2] = 21305 b[168][7][1] = 21306 b[168][7][0] = 21307 

c    b[169][1][2] = 21308 b[169][1][1] = 21309 b[169][1][0] = 21310 
c    b[169][2][2] = 21311 b[169][2][1] = 21312 b[169][2][0] = 21313 
c    b[169][3][2] = 21314 b[169][3][1] = 21315 b[169][3][0] = 21316 
c    b[169][4][2] = 21317 b[169][4][1] = 21318 b[169][4][0] = 21319 
c    b[169][5][2] = 21320 b[169][5][1] = 21321 b[169][5][0] = 21322 
c    b[169][6][2] = 21323 b[169][6][1] = 21324 b[169][6][0] = 21325 
c    b[169][7][2] = 21326 b[169][7][1] = 21327 b[169][7][0] = 21328 

c    b[170][1][2] = 21329 b[170][1][1] = 21330 b[170][1][0] = 21331 
c    b[170][2][2] = 21332 b[170][2][1] = 21333 b[170][2][0] = 21334 
c    b[170][3][2] = 21335 b[170][3][1] = 21336 b[170][3][0] = 21337 
c    b[170][4][2] = 21338 b[170][4][1] = 21339 b[170][4][0] = 21340 
c    b[170][5][2] = 21341 b[170][5][1] = 21342 b[170][5][0] = 21343 
c    b[170][6][2] = 21344 b[170][6][1] = 21345 b[170][6][0] = 21346 
c    b[170][7][2] = 21347 b[170][7][1] = 21348 b[170][7][0] = 21349 

c    b[171][1][2] = 21350 b[171][1][1] = 21351 b[171][1][0] = 21352 
c    b[171][2][2] = 21353 b[171][2][1] = 21354 b[171][2][0] = 21355 
c    b[171][3][2] = 21356 b[171][3][1] = 21357 b[171][3][0] = 21358 
c    b[171][4][2] = 21359 b[171][4][1] = 21360 b[171][4][0] = 21361 
c    b[171][5][2] = 21362 b[171][5][1] = 21363 b[171][5][0] = 21364 
c    b[171][6][2] = 21365 b[171][6][1] = 21366 b[171][6][0] = 21367 
c    b[171][7][2] = 21368 b[171][7][1] = 21369 b[171][7][0] = 21370 

c    b[172][1][2] = 21371 b[172][1][1] = 21372 b[172][1][0] = 21373 
c    b[172][2][2] = 21374 b[172][2][1] = 21375 b[172][2][0] = 21376 
c    b[172][3][2] = 21377 b[172][3][1] = 21378 b[172][3][0] = 21379 
c    b[172][4][2] = 21380 b[172][4][1] = 21381 b[172][4][0] = 21382 
c    b[172][5][2] = 21383 b[172][5][1] = 21384 b[172][5][0] = 21385 
c    b[172][6][2] = 21386 b[172][6][1] = 21387 b[172][6][0] = 21388 
c    b[172][7][2] = 21389 b[172][7][1] = 21390 b[172][7][0] = 21391 

c    b[173][1][2] = 21392 b[173][1][1] = 21393 b[173][1][0] = 21394 
c    b[173][2][2] = 21395 b[173][2][1] = 21396 b[173][2][0] = 21397 
c    b[173][3][2] = 21398 b[173][3][1] = 21399 b[173][3][0] = 21400 
c    b[173][4][2] = 21401 b[173][4][1] = 21402 b[173][4][0] = 21403 
c    b[173][5][2] = 21404 b[173][5][1] = 21405 b[173][5][0] = 21406 
c    b[173][6][2] = 21407 b[173][6][1] = 21408 b[173][6][0] = 21409 
c    b[173][7][2] = 21410 b[173][7][1] = 21411 b[173][7][0] = 21412 

c    b[174][1][2] = 21413 b[174][1][1] = 21414 b[174][1][0] = 21415 
c    b[174][2][2] = 21416 b[174][2][1] = 21417 b[174][2][0] = 21418 
c    b[174][3][2] = 21419 b[174][3][1] = 21420 b[174][3][0] = 21421 
c    b[174][4][2] = 21422 b[174][4][1] = 21423 b[174][4][0] = 21424 
c    b[174][5][2] = 21425 b[174][5][1] = 21426 b[174][5][0] = 21427 
c    b[174][6][2] = 21428 b[174][6][1] = 21429 b[174][6][0] = 21430 
c    b[174][7][2] = 21431 b[174][7][1] = 21432 b[174][7][0] = 21433 

c    b[175][1][2] = 21434 b[175][1][1] = 21435 b[175][1][0] = 21436 
c    b[175][2][2] = 21437 b[175][2][1] = 21438 b[175][2][0] = 21439 
c    b[175][3][2] = 21440 b[175][3][1] = 21441 b[175][3][0] = 21442 
c    b[175][4][2] = 21443 b[175][4][1] = 21444 b[175][4][0] = 21445 
c    b[175][5][2] = 21446 b[175][5][1] = 21447 b[175][5][0] = 21448 
c    b[175][6][2] = 21449 b[175][6][1] = 21450 b[175][6][0] = 21451 
c    b[175][7][2] = 21452 b[175][7][1] = 21453 b[175][7][0] = 21454 

c    b[176][1][2] = 21455 b[176][1][1] = 21456 b[176][1][0] = 21457 
c    b[176][2][2] = 21458 b[176][2][1] = 21459 b[176][2][0] = 21460 
c    b[176][3][2] = 21461 b[176][3][1] = 21462 b[176][3][0] = 21463 
c    b[176][4][2] = 21464 b[176][4][1] = 21465 b[176][4][0] = 21466 
c    b[176][5][2] = 21467 b[176][5][1] = 21468 b[176][5][0] = 21469 
c    b[176][6][2] = 21470 b[176][6][1] = 21471 b[176][6][0] = 21472 
c    b[176][7][2] = 21473 b[176][7][1] = 21474 b[176][7][0] = 21475 

c    b[177][1][2] = 21476 b[177][1][1] = 21477 b[177][1][0] = 21478 
c    b[177][2][2] = 21479 b[177][2][1] = 21480 b[177][2][0] = 21481 
c    b[177][3][2] = 21482 b[177][3][1] = 21483 b[177][3][0] = 21484 
c    b[177][4][2] = 21485 b[177][4][1] = 21486 b[177][4][0] = 21487 
c    b[177][5][2] = 21488 b[177][5][1] = 21489 b[177][5][0] = 21490 
c    b[177][6][2] = 21491 b[177][6][1] = 21492 b[177][6][0] = 21493 
c    b[177][7][2] = 21494 b[177][7][1] = 21495 b[177][7][0] = 21496 

c    b[178][1][2] = 21497 b[178][1][1] = 21498 b[178][1][0] = 21499 
c    b[178][2][2] = 21500 b[178][2][1] = 21501 b[178][2][0] = 21502 
c    b[178][3][2] = 21503 b[178][3][1] = 21504 b[178][3][0] = 21505 
c    b[178][4][2] = 21506 b[178][4][1] = 21507 b[178][4][0] = 21508 
c    b[178][5][2] = 21509 b[178][5][1] = 21510 b[178][5][0] = 21511 
c    b[178][6][2] = 21512 b[178][6][1] = 21513 b[178][6][0] = 21514 
c    b[178][7][2] = 21515 b[178][7][1] = 21516 b[178][7][0] = 21517 

c    b[179][1][2] = 21518 b[179][1][1] = 21519 b[179][1][0] = 21520 
c    b[179][2][2] = 21521 b[179][2][1] = 21522 b[179][2][0] = 21523 
c    b[179][3][2] = 21524 b[179][3][1] = 21525 b[179][3][0] = 21526 
c    b[179][4][2] = 21527 b[179][4][1] = 21528 b[179][4][0] = 21529 
c    b[179][5][2] = 21530 b[179][5][1] = 21531 b[179][5][0] = 21532 
c    b[179][6][2] = 21533 b[179][6][1] = 21534 b[179][6][0] = 21535 
c    b[179][7][2] = 21536 b[179][7][1] = 21537 b[179][7][0] = 21538 

c    b[180][1][2] = 21539 b[180][1][1] = 21540 b[180][1][0] = 21541 
c    b[180][2][2] = 21542 b[180][2][1] = 21543 b[180][2][0] = 21544 
c    b[180][3][2] = 21545 b[180][3][1] = 21546 b[180][3][0] = 21547 
c    b[180][4][2] = 21548 b[180][4][1] = 21549 b[180][4][0] = 21550 
c    b[180][5][2] = 21551 b[180][5][1] = 21552 b[180][5][0] = 21553 
c    b[180][6][2] = 21554 b[180][6][1] = 21555 b[180][6][0] = 21556 
c    b[180][7][2] = 21557 b[180][7][1] = 21558 b[180][7][0] = 21559 

c    b[181][1][2] = 21560 b[181][1][1] = 21561 b[181][1][0] = 21562 
c    b[181][2][2] = 21563 b[181][2][1] = 21564 b[181][2][0] = 21565 
c    b[181][3][2] = 21566 b[181][3][1] = 21567 b[181][3][0] = 21568 
c    b[181][4][2] = 21569 b[181][4][1] = 21570 b[181][4][0] = 21571 
c    b[181][5][2] = 21572 b[181][5][1] = 21573 b[181][5][0] = 21574 
c    b[181][6][2] = 21575 b[181][6][1] = 21576 b[181][6][0] = 21577 
c    b[181][7][2] = 21578 b[181][7][1] = 21579 b[181][7][0] = 21580 

c    b[182][1][2] = 21581 b[182][1][1] = 21582 b[182][1][0] = 21583 
c    b[182][2][2] = 21584 b[182][2][1] = 21585 b[182][2][0] = 21586 
c    b[182][3][2] = 21587 b[182][3][1] = 21588 b[182][3][0] = 21589 
c    b[182][4][2] = 21590 b[182][4][1] = 21591 b[182][4][0] = 21592 
c    b[182][5][2] = 21593 b[182][5][1] = 21594 b[182][5][0] = 21595 
c    b[182][6][2] = 21596 b[182][6][1] = 21597 b[182][6][0] = 21598 
c    b[182][7][2] = 21599 b[182][7][1] = 21600 b[182][7][0] = 21601 

c    b[183][1][2] = 21602 b[183][1][1] = 21603 b[183][1][0] = 21604 
c    b[183][2][2] = 21605 b[183][2][1] = 21606 b[183][2][0] = 21607 
c    b[183][3][2] = 21608 b[183][3][1] = 21609 b[183][3][0] = 21610 
c    b[183][4][2] = 21611 b[183][4][1] = 21612 b[183][4][0] = 21613 
c    b[183][5][2] = 21614 b[183][5][1] = 21615 b[183][5][0] = 21616 
c    b[183][6][2] = 21617 b[183][6][1] = 21618 b[183][6][0] = 21619 
c    b[183][7][2] = 21620 b[183][7][1] = 21621 b[183][7][0] = 21622 

c    b[184][1][2] = 21623 b[184][1][1] = 21624 b[184][1][0] = 21625 
c    b[184][2][2] = 21626 b[184][2][1] = 21627 b[184][2][0] = 21628 
c    b[184][3][2] = 21629 b[184][3][1] = 21630 b[184][3][0] = 21631 
c    b[184][4][2] = 21632 b[184][4][1] = 21633 b[184][4][0] = 21634 
c    b[184][5][2] = 21635 b[184][5][1] = 21636 b[184][5][0] = 21637 
c    b[184][6][2] = 21638 b[184][6][1] = 21639 b[184][6][0] = 21640 
c    b[184][7][2] = 21641 b[184][7][1] = 21642 b[184][7][0] = 21643 

c    b[185][1][2] = 21644 b[185][1][1] = 21645 b[185][1][0] = 21646 
c    b[185][2][2] = 21647 b[185][2][1] = 21648 b[185][2][0] = 21649 
c    b[185][3][2] = 21650 b[185][3][1] = 21651 b[185][3][0] = 21652 
c    b[185][4][2] = 21653 b[185][4][1] = 21654 b[185][4][0] = 21655 
c    b[185][5][2] = 21656 b[185][5][1] = 21657 b[185][5][0] = 21658 
c    b[185][6][2] = 21659 b[185][6][1] = 21660 b[185][6][0] = 21661 
c    b[185][7][2] = 21662 b[185][7][1] = 21663 b[185][7][0] = 21664 

c    b[186][1][2] = 21665 b[186][1][1] = 21666 b[186][1][0] = 21667 
c    b[186][2][2] = 21668 b[186][2][1] = 21669 b[186][2][0] = 21670 
c    b[186][3][2] = 21671 b[186][3][1] = 21672 b[186][3][0] = 21673 
c    b[186][4][2] = 21674 b[186][4][1] = 21675 b[186][4][0] = 21676 
c    b[186][5][2] = 21677 b[186][5][1] = 21678 b[186][5][0] = 21679 
c    b[186][6][2] = 21680 b[186][6][1] = 21681 b[186][6][0] = 21682 
c    b[186][7][2] = 21683 b[186][7][1] = 21684 b[186][7][0] = 21685 

c    b[187][1][2] = 21686 b[187][1][1] = 21687 b[187][1][0] = 21688 
c    b[187][2][2] = 21689 b[187][2][1] = 21690 b[187][2][0] = 21691 
c    b[187][3][2] = 21692 b[187][3][1] = 21693 b[187][3][0] = 21694 
c    b[187][4][2] = 21695 b[187][4][1] = 21696 b[187][4][0] = 21697 
c    b[187][5][2] = 21698 b[187][5][1] = 21699 b[187][5][0] = 21700 
c    b[187][6][2] = 21701 b[187][6][1] = 21702 b[187][6][0] = 21703 
c    b[187][7][2] = 21704 b[187][7][1] = 21705 b[187][7][0] = 21706 

c    b[188][1][2] = 21707 b[188][1][1] = 21708 b[188][1][0] = 21709 
c    b[188][2][2] = 21710 b[188][2][1] = 21711 b[188][2][0] = 21712 
c    b[188][3][2] = 21713 b[188][3][1] = 21714 b[188][3][0] = 21715 
c    b[188][4][2] = 21716 b[188][4][1] = 21717 b[188][4][0] = 21718 
c    b[188][5][2] = 21719 b[188][5][1] = 21720 b[188][5][0] = 21721 
c    b[188][6][2] = 21722 b[188][6][1] = 21723 b[188][6][0] = 21724 
c    b[188][7][2] = 21725 b[188][7][1] = 21726 b[188][7][0] = 21727 

c    b[189][1][2] = 21728 b[189][1][1] = 21729 b[189][1][0] = 21730 
c    b[189][2][2] = 21731 b[189][2][1] = 21732 b[189][2][0] = 21733 
c    b[189][3][2] = 21734 b[189][3][1] = 21735 b[189][3][0] = 21736 
c    b[189][4][2] = 21737 b[189][4][1] = 21738 b[189][4][0] = 21739 
c    b[189][5][2] = 21740 b[189][5][1] = 21741 b[189][5][0] = 21742 
c    b[189][6][2] = 21743 b[189][6][1] = 21744 b[189][6][0] = 21745 
c    b[189][7][2] = 21746 b[189][7][1] = 21747 b[189][7][0] = 21748 

c    b[190][1][2] = 21749 b[190][1][1] = 21750 b[190][1][0] = 21751 
c    b[190][2][2] = 21752 b[190][2][1] = 21753 b[190][2][0] = 21754 
c    b[190][3][2] = 21755 b[190][3][1] = 21756 b[190][3][0] = 21757 
c    b[190][4][2] = 21758 b[190][4][1] = 21759 b[190][4][0] = 21760 
c    b[190][5][2] = 21761 b[190][5][1] = 21762 b[190][5][0] = 21763 
c    b[190][6][2] = 21764 b[190][6][1] = 21765 b[190][6][0] = 21766 
c    b[190][7][2] = 21767 b[190][7][1] = 21768 b[190][7][0] = 21769 

c    b[191][1][2] = 21770 b[191][1][1] = 21771 b[191][1][0] = 21772 
c    b[191][2][2] = 21773 b[191][2][1] = 21774 b[191][2][0] = 21775 
c    b[191][3][2] = 21776 b[191][3][1] = 21777 b[191][3][0] = 21778 
c    b[191][4][2] = 21779 b[191][4][1] = 21780 b[191][4][0] = 21781 
c    b[191][5][2] = 21782 b[191][5][1] = 21783 b[191][5][0] = 21784 
c    b[191][6][2] = 21785 b[191][6][1] = 21786 b[191][6][0] = 21787 
c    b[191][7][2] = 21788 b[191][7][1] = 21789 b[191][7][0] = 21790 

c    b[192][1][2] = 21791 b[192][1][1] = 21792 b[192][1][0] = 21793 
c    b[192][2][2] = 21794 b[192][2][1] = 21795 b[192][2][0] = 21796 
c    b[192][3][2] = 21797 b[192][3][1] = 21798 b[192][3][0] = 21799 
c    b[192][4][2] = 21800 b[192][4][1] = 21801 b[192][4][0] = 21802 
c    b[192][5][2] = 21803 b[192][5][1] = 21804 b[192][5][0] = 21805 
c    b[192][6][2] = 21806 b[192][6][1] = 21807 b[192][6][0] = 21808 
c    b[192][7][2] = 21809 b[192][7][1] = 21810 b[192][7][0] = 21811 

c    b[193][1][2] = 21812 b[193][1][1] = 21813 b[193][1][0] = 21814 
c    b[193][2][2] = 21815 b[193][2][1] = 21816 b[193][2][0] = 21817 
c    b[193][3][2] = 21818 b[193][3][1] = 21819 b[193][3][0] = 21820 
c    b[193][4][2] = 21821 b[193][4][1] = 21822 b[193][4][0] = 21823 
c    b[193][5][2] = 21824 b[193][5][1] = 21825 b[193][5][0] = 21826 
c    b[193][6][2] = 21827 b[193][6][1] = 21828 b[193][6][0] = 21829 
c    b[193][7][2] = 21830 b[193][7][1] = 21831 b[193][7][0] = 21832 

c    b[194][1][2] = 21833 b[194][1][1] = 21834 b[194][1][0] = 21835 
c    b[194][2][2] = 21836 b[194][2][1] = 21837 b[194][2][0] = 21838 
c    b[194][3][2] = 21839 b[194][3][1] = 21840 b[194][3][0] = 21841 
c    b[194][4][2] = 21842 b[194][4][1] = 21843 b[194][4][0] = 21844 
c    b[194][5][2] = 21845 b[194][5][1] = 21846 b[194][5][0] = 21847 
c    b[194][6][2] = 21848 b[194][6][1] = 21849 b[194][6][0] = 21850 

c    b[195][1][2] = 21851 b[195][1][1] = 21852 b[195][1][0] = 21853 
c    b[195][2][2] = 21854 b[195][2][1] = 21855 b[195][2][0] = 21856 
c    b[195][3][2] = 21857 b[195][3][1] = 21858 b[195][3][0] = 21859 
c    b[195][4][2] = 21860 b[195][4][1] = 21861 b[195][4][0] = 21862 
c    b[195][5][2] = 21863 b[195][5][1] = 21864 b[195][5][0] = 21865 
c    b[195][6][2] = 21866 b[195][6][1] = 21867 b[195][6][0] = 21868 

c    b[196][1][2] = 21869 b[196][1][1] = 21870 b[196][1][0] = 21871 
c    b[196][2][2] = 21872 b[196][2][1] = 21873 b[196][2][0] = 21874 
c    b[196][3][2] = 21875 b[196][3][1] = 21876 b[196][3][0] = 21877 
c    b[196][4][2] = 21878 b[196][4][1] = 21879 b[196][4][0] = 21880 
c    b[196][5][2] = 21881 b[196][5][1] = 21882 b[196][5][0] = 21883 
c    b[196][6][2] = 21884 b[196][6][1] = 21885 b[196][6][0] = 21886 

c    b[197][1][2] = 21887 b[197][1][1] = 21888 b[197][1][0] = 21889 
c    b[197][2][2] = 21890 b[197][2][1] = 21891 b[197][2][0] = 21892 
c    b[197][3][2] = 21893 b[197][3][1] = 21894 b[197][3][0] = 21895 
c    b[197][4][2] = 21896 b[197][4][1] = 21897 b[197][4][0] = 21898 
c    b[197][5][2] = 21899 b[197][5][1] = 21900 b[197][5][0] = 21901 
c    b[197][6][2] = 21902 b[197][6][1] = 21903 b[197][6][0] = 21904 

c    b[198][1][2] = 21905 b[198][1][1] = 21906 b[198][1][0] = 21907 
c    b[198][2][2] = 21908 b[198][2][1] = 21909 b[198][2][0] = 21910 
c    b[198][3][2] = 21911 b[198][3][1] = 21912 b[198][3][0] = 21913 
c    b[198][4][2] = 21914 b[198][4][1] = 21915 b[198][4][0] = 21916 
c    b[198][5][2] = 21917 b[198][5][1] = 21918 b[198][5][0] = 21919 
c    b[198][6][2] = 21920 b[198][6][1] = 21921 b[198][6][0] = 21922 

c    b[199][1][2] = 21923 b[199][1][1] = 21924 b[199][1][0] = 21925 
c    b[199][2][2] = 21926 b[199][2][1] = 21927 b[199][2][0] = 21928 
c    b[199][3][2] = 21929 b[199][3][1] = 21930 b[199][3][0] = 21931 
c    b[199][4][2] = 21932 b[199][4][1] = 21933 b[199][4][0] = 21934 
c    b[199][5][2] = 21935 b[199][5][1] = 21936 b[199][5][0] = 21937 
c    b[199][6][2] = 21938 b[199][6][1] = 21939 b[199][6][0] = 21940 

c    b[200][1][2] = 21941 b[200][1][1] = 21942 b[200][1][0] = 21943 
c    b[200][2][2] = 21944 b[200][2][1] = 21945 b[200][2][0] = 21946 
c    b[200][3][2] = 21947 b[200][3][1] = 21948 b[200][3][0] = 21949 
c    b[200][4][2] = 21950 b[200][4][1] = 21951 b[200][4][0] = 21952 
c    b[200][5][2] = 21953 b[200][5][1] = 21954 b[200][5][0] = 21955 
c    b[200][6][2] = 21956 b[200][6][1] = 21957 b[200][6][0] = 21958 

c    b[201][1][2] = 21959 b[201][1][1] = 21960 b[201][1][0] = 21961 
c    b[201][2][2] = 21962 b[201][2][1] = 21963 b[201][2][0] = 21964 
c    b[201][3][2] = 21965 b[201][3][1] = 21966 b[201][3][0] = 21967 
c    b[201][4][2] = 21968 b[201][4][1] = 21969 b[201][4][0] = 21970 
c    b[201][5][2] = 21971 b[201][5][1] = 21972 b[201][5][0] = 21973 
c    b[201][6][2] = 21974 b[201][6][1] = 21975 b[201][6][0] = 21976 

c    b[202][1][2] = 21977 b[202][1][1] = 21978 b[202][1][0] = 21979 
c    b[202][2][2] = 21980 b[202][2][1] = 21981 b[202][2][0] = 21982 
c    b[202][3][2] = 21983 b[202][3][1] = 21984 b[202][3][0] = 21985 
c    b[202][4][2] = 21986 b[202][4][1] = 21987 b[202][4][0] = 21988 
c    b[202][5][2] = 21989 b[202][5][1] = 21990 b[202][5][0] = 21991 
c    b[202][6][2] = 21992 b[202][6][1] = 21993 b[202][6][0] = 21994 

c    b[203][1][2] = 21995 b[203][1][1] = 21996 b[203][1][0] = 21997 
c    b[203][2][2] = 21998 b[203][2][1] = 21999 b[203][2][0] = 22000 
c    b[203][3][2] = 22001 b[203][3][1] = 22002 b[203][3][0] = 22003 
c    b[203][4][2] = 22004 b[203][4][1] = 22005 b[203][4][0] = 22006 
c    b[203][5][2] = 22007 b[203][5][1] = 22008 b[203][5][0] = 22009 
c    b[203][6][2] = 22010 b[203][6][1] = 22011 b[203][6][0] = 22012 

c    b[204][1][2] = 22013 b[204][1][1] = 22014 b[204][1][0] = 22015 
c    b[204][2][2] = 22016 b[204][2][1] = 22017 b[204][2][0] = 22018 
c    b[204][3][2] = 22019 b[204][3][1] = 22020 b[204][3][0] = 22021 
c    b[204][4][2] = 22022 b[204][4][1] = 22023 b[204][4][0] = 22024 
c    b[204][5][2] = 22025 b[204][5][1] = 22026 b[204][5][0] = 22027 
c    b[204][6][2] = 22028 b[204][6][1] = 22029 b[204][6][0] = 22030 

c    b[205][1][2] = 22031 b[205][1][1] = 22032 b[205][1][0] = 22033 
c    b[205][2][2] = 22034 b[205][2][1] = 22035 b[205][2][0] = 22036 
c    b[205][3][2] = 22037 b[205][3][1] = 22038 b[205][3][0] = 22039 
c    b[205][4][2] = 22040 b[205][4][1] = 22041 b[205][4][0] = 22042 
c    b[205][5][2] = 22043 b[205][5][1] = 22044 b[205][5][0] = 22045 
c    b[205][6][2] = 22046 b[205][6][1] = 22047 b[205][6][0] = 22048 

c    b[206][1][2] = 22049 b[206][1][1] = 22050 b[206][1][0] = 22051 
c    b[206][2][2] = 22052 b[206][2][1] = 22053 b[206][2][0] = 22054 
c    b[206][3][2] = 22055 b[206][3][1] = 22056 b[206][3][0] = 22057 
c    b[206][4][2] = 22058 b[206][4][1] = 22059 b[206][4][0] = 22060 
c    b[206][5][2] = 22061 b[206][5][1] = 22062 b[206][5][0] = 22063 
c    b[206][6][2] = 22064 b[206][6][1] = 22065 b[206][6][0] = 22066 

c    b[207][1][2] = 22067 b[207][1][1] = 22068 b[207][1][0] = 22069 
c    b[207][2][2] = 22070 b[207][2][1] = 22071 b[207][2][0] = 22072 
c    b[207][3][2] = 22073 b[207][3][1] = 22074 b[207][3][0] = 22075 
c    b[207][4][2] = 22076 b[207][4][1] = 22077 b[207][4][0] = 22078 
c    b[207][5][2] = 22079 b[207][5][1] = 22080 b[207][5][0] = 22081 
c    b[207][6][2] = 22082 b[207][6][1] = 22083 b[207][6][0] = 22084 

c    b[208][1][2] = 22085 b[208][1][1] = 22086 b[208][1][0] = 22087 
c    b[208][2][2] = 22088 b[208][2][1] = 22089 b[208][2][0] = 22090 
c    b[208][3][2] = 22091 b[208][3][1] = 22092 b[208][3][0] = 22093 
c    b[208][4][2] = 22094 b[208][4][1] = 22095 b[208][4][0] = 22096 
c    b[208][5][2] = 22097 b[208][5][1] = 22098 b[208][5][0] = 22099 
c    b[208][6][2] = 22100 b[208][6][1] = 22101 b[208][6][0] = 22102 

c    b[209][1][2] = 22103 b[209][1][1] = 22104 b[209][1][0] = 22105 
c    b[209][2][2] = 22106 b[209][2][1] = 22107 b[209][2][0] = 22108 
c    b[209][3][2] = 22109 b[209][3][1] = 22110 b[209][3][0] = 22111 
c    b[209][4][2] = 22112 b[209][4][1] = 22113 b[209][4][0] = 22114 
c    b[209][5][2] = 22115 b[209][5][1] = 22116 b[209][5][0] = 22117 
c    b[209][6][2] = 22118 b[209][6][1] = 22119 b[209][6][0] = 22120 

c    b[210][1][2] = 22121 b[210][1][1] = 22122 b[210][1][0] = 22123 
c    b[210][2][2] = 22124 b[210][2][1] = 22125 b[210][2][0] = 22126 
c    b[210][3][2] = 22127 b[210][3][1] = 22128 b[210][3][0] = 22129 
c    b[210][4][2] = 22130 b[210][4][1] = 22131 b[210][4][0] = 22132 
c    b[210][5][2] = 22133 b[210][5][1] = 22134 b[210][5][0] = 22135 
c    b[210][6][2] = 22136 b[210][6][1] = 22137 b[210][6][0] = 22138 

c    b[211][1][2] = 22139 b[211][1][1] = 22140 b[211][1][0] = 22141 
c    b[211][2][2] = 22142 b[211][2][1] = 22143 b[211][2][0] = 22144 
c    b[211][3][2] = 22145 b[211][3][1] = 22146 b[211][3][0] = 22147 
c    b[211][4][2] = 22148 b[211][4][1] = 22149 b[211][4][0] = 22150 
c    b[211][5][2] = 22151 b[211][5][1] = 22152 b[211][5][0] = 22153 
c    b[211][6][2] = 22154 b[211][6][1] = 22155 b[211][6][0] = 22156 

c    b[212][1][2] = 22157 b[212][1][1] = 22158 b[212][1][0] = 22159 
c    b[212][2][2] = 22160 b[212][2][1] = 22161 b[212][2][0] = 22162 
c    b[212][3][2] = 22163 b[212][3][1] = 22164 b[212][3][0] = 22165 
c    b[212][4][2] = 22166 b[212][4][1] = 22167 b[212][4][0] = 22168 
c    b[212][5][2] = 22169 b[212][5][1] = 22170 b[212][5][0] = 22171 
c    b[212][6][2] = 22172 b[212][6][1] = 22173 b[212][6][0] = 22174 

c    b[213][1][2] = 22175 b[213][1][1] = 22176 b[213][1][0] = 22177 
c    b[213][2][2] = 22178 b[213][2][1] = 22179 b[213][2][0] = 22180 
c    b[213][3][2] = 22181 b[213][3][1] = 22182 b[213][3][0] = 22183 
c    b[213][4][2] = 22184 b[213][4][1] = 22185 b[213][4][0] = 22186 
c    b[213][5][2] = 22187 b[213][5][1] = 22188 b[213][5][0] = 22189 
c    b[213][6][2] = 22190 b[213][6][1] = 22191 b[213][6][0] = 22192 

c    b[214][1][2] = 22193 b[214][1][1] = 22194 b[214][1][0] = 22195 
c    b[214][2][2] = 22196 b[214][2][1] = 22197 b[214][2][0] = 22198 
c    b[214][3][2] = 22199 b[214][3][1] = 22200 b[214][3][0] = 22201 
c    b[214][4][2] = 22202 b[214][4][1] = 22203 b[214][4][0] = 22204 
c    b[214][5][2] = 22205 b[214][5][1] = 22206 b[214][5][0] = 22207 
c    b[214][6][2] = 22208 b[214][6][1] = 22209 b[214][6][0] = 22210 

c    b[215][1][2] = 22211 b[215][1][1] = 22212 b[215][1][0] = 22213 
c    b[215][2][2] = 22214 b[215][2][1] = 22215 b[215][2][0] = 22216 
c    b[215][3][2] = 22217 b[215][3][1] = 22218 b[215][3][0] = 22219 
c    b[215][4][2] = 22220 b[215][4][1] = 22221 b[215][4][0] = 22222 
c    b[215][5][2] = 22223 b[215][5][1] = 22224 b[215][5][0] = 22225 
c    b[215][6][2] = 22226 b[215][6][1] = 22227 b[215][6][0] = 22228 

c    b[216][1][2] = 22229 b[216][1][1] = 22230 b[216][1][0] = 22231 
c    b[216][2][2] = 22232 b[216][2][1] = 22233 b[216][2][0] = 22234 
c    b[216][3][2] = 22235 b[216][3][1] = 22236 b[216][3][0] = 22237 
c    b[216][4][2] = 22238 b[216][4][1] = 22239 b[216][4][0] = 22240 
c    b[216][5][2] = 22241 b[216][5][1] = 22242 b[216][5][0] = 22243 
c    b[216][6][2] = 22244 b[216][6][1] = 22245 b[216][6][0] = 22246 

c    b[217][1][2] = 22247 b[217][1][1] = 22248 b[217][1][0] = 22249 
c    b[217][2][2] = 22250 b[217][2][1] = 22251 b[217][2][0] = 22252 
c    b[217][3][2] = 22253 b[217][3][1] = 22254 b[217][3][0] = 22255 
c    b[217][4][2] = 22256 b[217][4][1] = 22257 b[217][4][0] = 22258 
c    b[217][5][2] = 22259 b[217][5][1] = 22260 b[217][5][0] = 22261 
c    b[217][6][2] = 22262 b[217][6][1] = 22263 b[217][6][0] = 22264 

c    b[218][1][2] = 22265 b[218][1][1] = 22266 b[218][1][0] = 22267 
c    b[218][2][2] = 22268 b[218][2][1] = 22269 b[218][2][0] = 22270 
c    b[218][3][2] = 22271 b[218][3][1] = 22272 b[218][3][0] = 22273 
c    b[218][4][2] = 22274 b[218][4][1] = 22275 b[218][4][0] = 22276 
c    b[218][5][2] = 22277 b[218][5][1] = 22278 b[218][5][0] = 22279 
c    b[218][6][2] = 22280 b[218][6][1] = 22281 b[218][6][0] = 22282 

c    b[219][1][2] = 22283 b[219][1][1] = 22284 b[219][1][0] = 22285 
c    b[219][2][2] = 22286 b[219][2][1] = 22287 b[219][2][0] = 22288 
c    b[219][3][2] = 22289 b[219][3][1] = 22290 b[219][3][0] = 22291 
c    b[219][4][2] = 22292 b[219][4][1] = 22293 b[219][4][0] = 22294 
c    b[219][5][2] = 22295 b[219][5][1] = 22296 b[219][5][0] = 22297 
c    b[219][6][2] = 22298 b[219][6][1] = 22299 b[219][6][0] = 22300 

c    b[220][1][2] = 22301 b[220][1][1] = 22302 b[220][1][0] = 22303 
c    b[220][2][2] = 22304 b[220][2][1] = 22305 b[220][2][0] = 22306 
c    b[220][3][2] = 22307 b[220][3][1] = 22308 b[220][3][0] = 22309 
c    b[220][4][2] = 22310 b[220][4][1] = 22311 b[220][4][0] = 22312 
c    b[220][5][2] = 22313 b[220][5][1] = 22314 b[220][5][0] = 22315 
c    b[220][6][2] = 22316 b[220][6][1] = 22317 b[220][6][0] = 22318 

c    b[221][1][2] = 22319 b[221][1][1] = 22320 b[221][1][0] = 22321 
c    b[221][2][2] = 22322 b[221][2][1] = 22323 b[221][2][0] = 22324 
c    b[221][3][2] = 22325 b[221][3][1] = 22326 b[221][3][0] = 22327 
c    b[221][4][2] = 22328 b[221][4][1] = 22329 b[221][4][0] = 22330 
c    b[221][5][2] = 22331 b[221][5][1] = 22332 b[221][5][0] = 22333 
c    b[221][6][2] = 22334 b[221][6][1] = 22335 b[221][6][0] = 22336 

c    b[222][1][2] = 22337 b[222][1][1] = 22338 b[222][1][0] = 22339 
c    b[222][2][2] = 22340 b[222][2][1] = 22341 b[222][2][0] = 22342 
c    b[222][3][2] = 22343 b[222][3][1] = 22344 b[222][3][0] = 22345 
c    b[222][4][2] = 22346 b[222][4][1] = 22347 b[222][4][0] = 22348 
c    b[222][5][2] = 22349 b[222][5][1] = 22350 b[222][5][0] = 22351 
c    b[222][6][2] = 22352 b[222][6][1] = 22353 b[222][6][0] = 22354 

c    b[223][1][2] = 22355 b[223][1][1] = 22356 b[223][1][0] = 22357 
c    b[223][2][2] = 22358 b[223][2][1] = 22359 b[223][2][0] = 22360 
c    b[223][3][2] = 22361 b[223][3][1] = 22362 b[223][3][0] = 22363 
c    b[223][4][2] = 22364 b[223][4][1] = 22365 b[223][4][0] = 22366 
c    b[223][5][2] = 22367 b[223][5][1] = 22368 b[223][5][0] = 22369 
c    b[223][6][2] = 22370 b[223][6][1] = 22371 b[223][6][0] = 22372 

c    b[224][1][2] = 22373 b[224][1][1] = 22374 b[224][1][0] = 22375 
c    b[224][2][2] = 22376 b[224][2][1] = 22377 b[224][2][0] = 22378 
c    b[224][3][2] = 22379 b[224][3][1] = 22380 b[224][3][0] = 22381 
c    b[224][4][2] = 22382 b[224][4][1] = 22383 b[224][4][0] = 22384 
c    b[224][5][2] = 22385 b[224][5][1] = 22386 b[224][5][0] = 22387 
c    b[224][6][2] = 22388 b[224][6][1] = 22389 b[224][6][0] = 22390 

c    b[225][1][2] = 22391 b[225][1][1] = 22392 b[225][1][0] = 22393 
c    b[225][2][2] = 22394 b[225][2][1] = 22395 b[225][2][0] = 22396 
c    b[225][3][2] = 22397 b[225][3][1] = 22398 b[225][3][0] = 22399 
c    b[225][4][2] = 22400 b[225][4][1] = 22401 b[225][4][0] = 22402 
c    b[225][5][2] = 22403 b[225][5][1] = 22404 b[225][5][0] = 22405 
c    b[225][6][2] = 22406 b[225][6][1] = 22407 b[225][6][0] = 22408 

c    b[226][1][2] = 22409 b[226][1][1] = 22410 b[226][1][0] = 22411 
c    b[226][2][2] = 22412 b[226][2][1] = 22413 b[226][2][0] = 22414 
c    b[226][3][2] = 22415 b[226][3][1] = 22416 b[226][3][0] = 22417 
c    b[226][4][2] = 22418 b[226][4][1] = 22419 b[226][4][0] = 22420 
c    b[226][5][2] = 22421 b[226][5][1] = 22422 b[226][5][0] = 22423 
c    b[226][6][2] = 22424 b[226][6][1] = 22425 b[226][6][0] = 22426 

c    b[227][1][2] = 22427 b[227][1][1] = 22428 b[227][1][0] = 22429 
c    b[227][2][2] = 22430 b[227][2][1] = 22431 b[227][2][0] = 22432 
c    b[227][3][2] = 22433 b[227][3][1] = 22434 b[227][3][0] = 22435 
c    b[227][4][2] = 22436 b[227][4][1] = 22437 b[227][4][0] = 22438 
c    b[227][5][2] = 22439 b[227][5][1] = 22440 b[227][5][0] = 22441 
c    b[227][6][2] = 22442 b[227][6][1] = 22443 b[227][6][0] = 22444 

c    b[228][1][2] = 22445 b[228][1][1] = 22446 b[228][1][0] = 22447 
c    b[228][2][2] = 22448 b[228][2][1] = 22449 b[228][2][0] = 22450 
c    b[228][3][2] = 22451 b[228][3][1] = 22452 b[228][3][0] = 22453 
c    b[228][4][2] = 22454 b[228][4][1] = 22455 b[228][4][0] = 22456 
c    b[228][5][2] = 22457 b[228][5][1] = 22458 b[228][5][0] = 22459 
c    b[228][6][2] = 22460 b[228][6][1] = 22461 b[228][6][0] = 22462 

c    b[229][1][2] = 22463 b[229][1][1] = 22464 b[229][1][0] = 22465 
c    b[229][2][2] = 22466 b[229][2][1] = 22467 b[229][2][0] = 22468 
c    b[229][3][2] = 22469 b[229][3][1] = 22470 b[229][3][0] = 22471 
c    b[229][4][2] = 22472 b[229][4][1] = 22473 b[229][4][0] = 22474 
c    b[229][5][2] = 22475 b[229][5][1] = 22476 b[229][5][0] = 22477 
c    b[229][6][2] = 22478 b[229][6][1] = 22479 b[229][6][0] = 22480 

c    b[230][1][2] = 22481 b[230][1][1] = 22482 b[230][1][0] = 22483 
c    b[230][2][2] = 22484 b[230][2][1] = 22485 b[230][2][0] = 22486 
c    b[230][3][2] = 22487 b[230][3][1] = 22488 b[230][3][0] = 22489 
c    b[230][4][2] = 22490 b[230][4][1] = 22491 b[230][4][0] = 22492 
c    b[230][5][2] = 22493 b[230][5][1] = 22494 b[230][5][0] = 22495 
c    b[230][6][2] = 22496 b[230][6][1] = 22497 b[230][6][0] = 22498 

c    b[231][1][2] = 22499 b[231][1][1] = 22500 b[231][1][0] = 22501 
c    b[231][2][2] = 22502 b[231][2][1] = 22503 b[231][2][0] = 22504 
c    b[231][3][2] = 22505 b[231][3][1] = 22506 b[231][3][0] = 22507 
c    b[231][4][2] = 22508 b[231][4][1] = 22509 b[231][4][0] = 22510 
c    b[231][5][2] = 22511 b[231][5][1] = 22512 b[231][5][0] = 22513 
c    b[231][6][2] = 22514 b[231][6][1] = 22515 b[231][6][0] = 22516 

c    b[232][1][2] = 22517 b[232][1][1] = 22518 b[232][1][0] = 22519 
c    b[232][2][2] = 22520 b[232][2][1] = 22521 b[232][2][0] = 22522 
c    b[232][3][2] = 22523 b[232][3][1] = 22524 b[232][3][0] = 22525 
c    b[232][4][2] = 22526 b[232][4][1] = 22527 b[232][4][0] = 22528 
c    b[232][5][2] = 22529 b[232][5][1] = 22530 b[232][5][0] = 22531 
c    b[232][6][2] = 22532 b[232][6][1] = 22533 b[232][6][0] = 22534 

c    b[233][1][2] = 22535 b[233][1][1] = 22536 b[233][1][0] = 22537 
c    b[233][2][2] = 22538 b[233][2][1] = 22539 b[233][2][0] = 22540 
c    b[233][3][2] = 22541 b[233][3][1] = 22542 b[233][3][0] = 22543 
c    b[233][4][2] = 22544 b[233][4][1] = 22545 b[233][4][0] = 22546 
c    b[233][5][2] = 22547 b[233][5][1] = 22548 b[233][5][0] = 22549 

c    b[234][1][2] = 22550 b[234][1][1] = 22551 b[234][1][0] = 22552 
c    b[234][2][2] = 22553 b[234][2][1] = 22554 b[234][2][0] = 22555 
c    b[234][3][2] = 22556 b[234][3][1] = 22557 b[234][3][0] = 22558 
c    b[234][4][2] = 22559 b[234][4][1] = 22560 b[234][4][0] = 22561 
c    b[234][5][2] = 22562 b[234][5][1] = 22563 b[234][5][0] = 22564 

c    b[235][1][2] = 22565 b[235][1][1] = 22566 b[235][1][0] = 22567 
c    b[235][2][2] = 22568 b[235][2][1] = 22569 b[235][2][0] = 22570 
c    b[235][3][2] = 22571 b[235][3][1] = 22572 b[235][3][0] = 22573 
c    b[235][4][2] = 22574 b[235][4][1] = 22575 b[235][4][0] = 22576 
c    b[235][5][2] = 22577 b[235][5][1] = 22578 b[235][5][0] = 22579 

c    b[236][1][2] = 22580 b[236][1][1] = 22581 b[236][1][0] = 22582 
c    b[236][2][2] = 22583 b[236][2][1] = 22584 b[236][2][0] = 22585 
c    b[236][3][2] = 22586 b[236][3][1] = 22587 b[236][3][0] = 22588 
c    b[236][4][2] = 22589 b[236][4][1] = 22590 b[236][4][0] = 22591 
c    b[236][5][2] = 22592 b[236][5][1] = 22593 b[236][5][0] = 22594 

c    b[237][1][2] = 22595 b[237][1][1] = 22596 b[237][1][0] = 22597 
c    b[237][2][2] = 22598 b[237][2][1] = 22599 b[237][2][0] = 22600 
c    b[237][3][2] = 22601 b[237][3][1] = 22602 b[237][3][0] = 22603 
c    b[237][4][2] = 22604 b[237][4][1] = 22605 b[237][4][0] = 22606 
c    b[237][5][2] = 22607 b[237][5][1] = 22608 b[237][5][0] = 22609 

c    b[238][1][2] = 22610 b[238][1][1] = 22611 b[238][1][0] = 22612 
c    b[238][2][2] = 22613 b[238][2][1] = 22614 b[238][2][0] = 22615 
c    b[238][3][2] = 22616 b[238][3][1] = 22617 b[238][3][0] = 22618 
c    b[238][4][2] = 22619 b[238][4][1] = 22620 b[238][4][0] = 22621 
c    b[238][5][2] = 22622 b[238][5][1] = 22623 b[238][5][0] = 22624 

c    b[239][1][2] = 22625 b[239][1][1] = 22626 b[239][1][0] = 22627 
c    b[239][2][2] = 22628 b[239][2][1] = 22629 b[239][2][0] = 22630 
c    b[239][3][2] = 22631 b[239][3][1] = 22632 b[239][3][0] = 22633 
c    b[239][4][2] = 22634 b[239][4][1] = 22635 b[239][4][0] = 22636 
c    b[239][5][2] = 22637 b[239][5][1] = 22638 b[239][5][0] = 22639 

c    b[240][1][2] = 22640 b[240][1][1] = 22641 b[240][1][0] = 22642 
c    b[240][2][2] = 22643 b[240][2][1] = 22644 b[240][2][0] = 22645 
c    b[240][3][2] = 22646 b[240][3][1] = 22647 b[240][3][0] = 22648 
c    b[240][4][2] = 22649 b[240][4][1] = 22650 b[240][4][0] = 22651 
c    b[240][5][2] = 22652 b[240][5][1] = 22653 b[240][5][0] = 22654 

c    b[241][1][2] = 22655 b[241][1][1] = 22656 b[241][1][0] = 22657 
c    b[241][2][2] = 22658 b[241][2][1] = 22659 b[241][2][0] = 22660 
c    b[241][3][2] = 22661 b[241][3][1] = 22662 b[241][3][0] = 22663 
c    b[241][4][2] = 22664 b[241][4][1] = 22665 b[241][4][0] = 22666 
c    b[241][5][2] = 22667 b[241][5][1] = 22668 b[241][5][0] = 22669 

c    b[242][1][2] = 22670 b[242][1][1] = 22671 b[242][1][0] = 22672 
c    b[242][2][2] = 22673 b[242][2][1] = 22674 b[242][2][0] = 22675 
c    b[242][3][2] = 22676 b[242][3][1] = 22677 b[242][3][0] = 22678 
c    b[242][4][2] = 22679 b[242][4][1] = 22680 b[242][4][0] = 22681 
c    b[242][5][2] = 22682 b[242][5][1] = 22683 b[242][5][0] = 22684 

c    b[243][1][2] = 22685 b[243][1][1] = 22686 b[243][1][0] = 22687 
c    b[243][2][2] = 22688 b[243][2][1] = 22689 b[243][2][0] = 22690 
c    b[243][3][2] = 22691 b[243][3][1] = 22692 b[243][3][0] = 22693 
c    b[243][4][2] = 22694 b[243][4][1] = 22695 b[243][4][0] = 22696 
c    b[243][5][2] = 22697 b[243][5][1] = 22698 b[243][5][0] = 22699 

c    b[244][1][2] = 22700 b[244][1][1] = 22701 b[244][1][0] = 22702 
c    b[244][2][2] = 22703 b[244][2][1] = 22704 b[244][2][0] = 22705 
c    b[244][3][2] = 22706 b[244][3][1] = 22707 b[244][3][0] = 22708 
c    b[244][4][2] = 22709 b[244][4][1] = 22710 b[244][4][0] = 22711 
c    b[244][5][2] = 22712 b[244][5][1] = 22713 b[244][5][0] = 22714 

c    b[245][1][2] = 22715 b[245][1][1] = 22716 b[245][1][0] = 22717 
c    b[245][2][2] = 22718 b[245][2][1] = 22719 b[245][2][0] = 22720 
c    b[245][3][2] = 22721 b[245][3][1] = 22722 b[245][3][0] = 22723 
c    b[245][4][2] = 22724 b[245][4][1] = 22725 b[245][4][0] = 22726 
c    b[245][5][2] = 22727 b[245][5][1] = 22728 b[245][5][0] = 22729 

c    b[246][1][2] = 22730 b[246][1][1] = 22731 b[246][1][0] = 22732 
c    b[246][2][2] = 22733 b[246][2][1] = 22734 b[246][2][0] = 22735 
c    b[246][3][2] = 22736 b[246][3][1] = 22737 b[246][3][0] = 22738 
c    b[246][4][2] = 22739 b[246][4][1] = 22740 b[246][4][0] = 22741 
c    b[246][5][2] = 22742 b[246][5][1] = 22743 b[246][5][0] = 22744 

c    b[247][1][2] = 22745 b[247][1][1] = 22746 b[247][1][0] = 22747 
c    b[247][2][2] = 22748 b[247][2][1] = 22749 b[247][2][0] = 22750 
c    b[247][3][2] = 22751 b[247][3][1] = 22752 b[247][3][0] = 22753 
c    b[247][4][2] = 22754 b[247][4][1] = 22755 b[247][4][0] = 22756 
c    b[247][5][2] = 22757 b[247][5][1] = 22758 b[247][5][0] = 22759 

c    b[248][1][2] = 22760 b[248][1][1] = 22761 b[248][1][0] = 22762 
c    b[248][2][2] = 22763 b[248][2][1] = 22764 b[248][2][0] = 22765 
c    b[248][3][2] = 22766 b[248][3][1] = 22767 b[248][3][0] = 22768 
c    b[248][4][2] = 22769 b[248][4][1] = 22770 b[248][4][0] = 22771 
c    b[248][5][2] = 22772 b[248][5][1] = 22773 b[248][5][0] = 22774 

c    b[249][1][2] = 22775 b[249][1][1] = 22776 b[249][1][0] = 22777 
c    b[249][2][2] = 22778 b[249][2][1] = 22779 b[249][2][0] = 22780 
c    b[249][3][2] = 22781 b[249][3][1] = 22782 b[249][3][0] = 22783 
c    b[249][4][2] = 22784 b[249][4][1] = 22785 b[249][4][0] = 22786 
c    b[249][5][2] = 22787 b[249][5][1] = 22788 b[249][5][0] = 22789 

c    b[250][1][2] = 22790 b[250][1][1] = 22791 b[250][1][0] = 22792 
c    b[250][2][2] = 22793 b[250][2][1] = 22794 b[250][2][0] = 22795 
c    b[250][3][2] = 22796 b[250][3][1] = 22797 b[250][3][0] = 22798 
c    b[250][4][2] = 22799 b[250][4][1] = 22800 b[250][4][0] = 22801 
c    b[250][5][2] = 22802 b[250][5][1] = 22803 b[250][5][0] = 22804 

c    b[251][1][2] = 22805 b[251][1][1] = 22806 b[251][1][0] = 22807 
c    b[251][2][2] = 22808 b[251][2][1] = 22809 b[251][2][0] = 22810 
c    b[251][3][2] = 22811 b[251][3][1] = 22812 b[251][3][0] = 22813 
c    b[251][4][2] = 22814 b[251][4][1] = 22815 b[251][4][0] = 22816 
c    b[251][5][2] = 22817 b[251][5][1] = 22818 b[251][5][0] = 22819 

c    b[252][1][2] = 22820 b[252][1][1] = 22821 b[252][1][0] = 22822 
c    b[252][2][2] = 22823 b[252][2][1] = 22824 b[252][2][0] = 22825 
c    b[252][3][2] = 22826 b[252][3][1] = 22827 b[252][3][0] = 22828 
c    b[252][4][2] = 22829 b[252][4][1] = 22830 b[252][4][0] = 22831 
c    b[252][5][2] = 22832 b[252][5][1] = 22833 b[252][5][0] = 22834 

c    b[253][1][2] = 22835 b[253][1][1] = 22836 b[253][1][0] = 22837 
c    b[253][2][2] = 22838 b[253][2][1] = 22839 b[253][2][0] = 22840 
c    b[253][3][2] = 22841 b[253][3][1] = 22842 b[253][3][0] = 22843 
c    b[253][4][2] = 22844 b[253][4][1] = 22845 b[253][4][0] = 22846 
c    b[253][5][2] = 22847 b[253][5][1] = 22848 b[253][5][0] = 22849 

c    b[254][1][2] = 22850 b[254][1][1] = 22851 b[254][1][0] = 22852 
c    b[254][2][2] = 22853 b[254][2][1] = 22854 b[254][2][0] = 22855 
c    b[254][3][2] = 22856 b[254][3][1] = 22857 b[254][3][0] = 22858 
c    b[254][4][2] = 22859 b[254][4][1] = 22860 b[254][4][0] = 22861 
c    b[254][5][2] = 22862 b[254][5][1] = 22863 b[254][5][0] = 22864 

c    b[255][1][2] = 22865 b[255][1][1] = 22866 b[255][1][0] = 22867 
c    b[255][2][2] = 22868 b[255][2][1] = 22869 b[255][2][0] = 22870 
c    b[255][3][2] = 22871 b[255][3][1] = 22872 b[255][3][0] = 22873 
c    b[255][4][2] = 22874 b[255][4][1] = 22875 b[255][4][0] = 22876 
c    b[255][5][2] = 22877 b[255][5][1] = 22878 b[255][5][0] = 22879 

c    b[256][1][2] = 22880 b[256][1][1] = 22881 b[256][1][0] = 22882 
c    b[256][2][2] = 22883 b[256][2][1] = 22884 b[256][2][0] = 22885 
c    b[256][3][2] = 22886 b[256][3][1] = 22887 b[256][3][0] = 22888 
c    b[256][4][2] = 22889 b[256][4][1] = 22890 b[256][4][0] = 22891 
c    b[256][5][2] = 22892 b[256][5][1] = 22893 b[256][5][0] = 22894 

c    b[257][1][2] = 22895 b[257][1][1] = 22896 b[257][1][0] = 22897 
c    b[257][2][2] = 22898 b[257][2][1] = 22899 b[257][2][0] = 22900 
c    b[257][3][2] = 22901 b[257][3][1] = 22902 b[257][3][0] = 22903 
c    b[257][4][2] = 22904 b[257][4][1] = 22905 b[257][4][0] = 22906 
c    b[257][5][2] = 22907 b[257][5][1] = 22908 b[257][5][0] = 22909 

c    b[258][1][2] = 22910 b[258][1][1] = 22911 b[258][1][0] = 22912 
c    b[258][2][2] = 22913 b[258][2][1] = 22914 b[258][2][0] = 22915 
c    b[258][3][2] = 22916 b[258][3][1] = 22917 b[258][3][0] = 22918 
c    b[258][4][2] = 22919 b[258][4][1] = 22920 b[258][4][0] = 22921 
c    b[258][5][2] = 22922 b[258][5][1] = 22923 b[258][5][0] = 22924 

c    b[259][1][2] = 22925 b[259][1][1] = 22926 b[259][1][0] = 22927 
c    b[259][2][2] = 22928 b[259][2][1] = 22929 b[259][2][0] = 22930 
c    b[259][3][2] = 22931 b[259][3][1] = 22932 b[259][3][0] = 22933 
c    b[259][4][2] = 22934 b[259][4][1] = 22935 b[259][4][0] = 22936 
c    b[259][5][2] = 22937 b[259][5][1] = 22938 b[259][5][0] = 22939 

c    b[260][1][2] = 22940 b[260][1][1] = 22941 b[260][1][0] = 22942 
c    b[260][2][2] = 22943 b[260][2][1] = 22944 b[260][2][0] = 22945 
c    b[260][3][2] = 22946 b[260][3][1] = 22947 b[260][3][0] = 22948 
c    b[260][4][2] = 22949 b[260][4][1] = 22950 b[260][4][0] = 22951 
c    b[260][5][2] = 22952 b[260][5][1] = 22953 b[260][5][0] = 22954 

c    b[261][1][2] = 22955 b[261][1][1] = 22956 b[261][1][0] = 22957 
c    b[261][2][2] = 22958 b[261][2][1] = 22959 b[261][2][0] = 22960 
c    b[261][3][2] = 22961 b[261][3][1] = 22962 b[261][3][0] = 22963 
c    b[261][4][2] = 22964 b[261][4][1] = 22965 b[261][4][0] = 22966 
c    b[261][5][2] = 22967 b[261][5][1] = 22968 b[261][5][0] = 22969 

c    b[262][1][2] = 22970 b[262][1][1] = 22971 b[262][1][0] = 22972 
c    b[262][2][2] = 22973 b[262][2][1] = 22974 b[262][2][0] = 22975 
c    b[262][3][2] = 22976 b[262][3][1] = 22977 b[262][3][0] = 22978 
c    b[262][4][2] = 22979 b[262][4][1] = 22980 b[262][4][0] = 22981 
c    b[262][5][2] = 22982 b[262][5][1] = 22983 b[262][5][0] = 22984 

c    b[263][1][2] = 22985 b[263][1][1] = 22986 b[263][1][0] = 22987 
c    b[263][2][2] = 22988 b[263][2][1] = 22989 b[263][2][0] = 22990 
c    b[263][3][2] = 22991 b[263][3][1] = 22992 b[263][3][0] = 22993 
c    b[263][4][2] = 22994 b[263][4][1] = 22995 b[263][4][0] = 22996 
c    b[263][5][2] = 22997 b[263][5][1] = 22998 b[263][5][0] = 22999 

c    b[264][1][2] = 23000 b[264][1][1] = 23001 b[264][1][0] = 23002 
c    b[264][2][2] = 23003 b[264][2][1] = 23004 b[264][2][0] = 23005 
c    b[264][3][2] = 23006 b[264][3][1] = 23007 b[264][3][0] = 23008 
c    b[264][4][2] = 23009 b[264][4][1] = 23010 b[264][4][0] = 23011 
c    b[264][5][2] = 23012 b[264][5][1] = 23013 b[264][5][0] = 23014 

c    b[265][1][2] = 23015 b[265][1][1] = 23016 b[265][1][0] = 23017 
c    b[265][2][2] = 23018 b[265][2][1] = 23019 b[265][2][0] = 23020 
c    b[265][3][2] = 23021 b[265][3][1] = 23022 b[265][3][0] = 23023 
c    b[265][4][2] = 23024 b[265][4][1] = 23025 b[265][4][0] = 23026 
c    b[265][5][2] = 23027 b[265][5][1] = 23028 b[265][5][0] = 23029 

c    b[266][1][2] = 23030 b[266][1][1] = 23031 b[266][1][0] = 23032 
c    b[266][2][2] = 23033 b[266][2][1] = 23034 b[266][2][0] = 23035 
c    b[266][3][2] = 23036 b[266][3][1] = 23037 b[266][3][0] = 23038 
c    b[266][4][2] = 23039 b[266][4][1] = 23040 b[266][4][0] = 23041 
c    b[266][5][2] = 23042 b[266][5][1] = 23043 b[266][5][0] = 23044 

c    b[267][1][2] = 23045 b[267][1][1] = 23046 b[267][1][0] = 23047 
c    b[267][2][2] = 23048 b[267][2][1] = 23049 b[267][2][0] = 23050 
c    b[267][3][2] = 23051 b[267][3][1] = 23052 b[267][3][0] = 23053 
c    b[267][4][2] = 23054 b[267][4][1] = 23055 b[267][4][0] = 23056 
c    b[267][5][2] = 23057 b[267][5][1] = 23058 b[267][5][0] = 23059 

c    b[268][1][2] = 23060 b[268][1][1] = 23061 b[268][1][0] = 23062 
c    b[268][2][2] = 23063 b[268][2][1] = 23064 b[268][2][0] = 23065 
c    b[268][3][2] = 23066 b[268][3][1] = 23067 b[268][3][0] = 23068 
c    b[268][4][2] = 23069 b[268][4][1] = 23070 b[268][4][0] = 23071 
c    b[268][5][2] = 23072 b[268][5][1] = 23073 b[268][5][0] = 23074 

c    b[269][1][2] = 23075 b[269][1][1] = 23076 b[269][1][0] = 23077 
c    b[269][2][2] = 23078 b[269][2][1] = 23079 b[269][2][0] = 23080 
c    b[269][3][2] = 23081 b[269][3][1] = 23082 b[269][3][0] = 23083 
c    b[269][4][2] = 23084 b[269][4][1] = 23085 b[269][4][0] = 23086 
c    b[269][5][2] = 23087 b[269][5][1] = 23088 b[269][5][0] = 23089 

c    b[270][1][2] = 23090 b[270][1][1] = 23091 b[270][1][0] = 23092 
c    b[270][2][2] = 23093 b[270][2][1] = 23094 b[270][2][0] = 23095 
c    b[270][3][2] = 23096 b[270][3][1] = 23097 b[270][3][0] = 23098 
c    b[270][4][2] = 23099 b[270][4][1] = 23100 b[270][4][0] = 23101 
c    b[270][5][2] = 23102 b[270][5][1] = 23103 b[270][5][0] = 23104 

c    b[271][1][2] = 23105 b[271][1][1] = 23106 b[271][1][0] = 23107 
c    b[271][2][2] = 23108 b[271][2][1] = 23109 b[271][2][0] = 23110 
c    b[271][3][2] = 23111 b[271][3][1] = 23112 b[271][3][0] = 23113 
c    b[271][4][2] = 23114 b[271][4][1] = 23115 b[271][4][0] = 23116 
c    b[271][5][2] = 23117 b[271][5][1] = 23118 b[271][5][0] = 23119 

c    b[272][1][2] = 23120 b[272][1][1] = 23121 b[272][1][0] = 23122 
c    b[272][2][2] = 23123 b[272][2][1] = 23124 b[272][2][0] = 23125 
c    b[272][3][2] = 23126 b[272][3][1] = 23127 b[272][3][0] = 23128 
c    b[272][4][2] = 23129 b[272][4][1] = 23130 b[272][4][0] = 23131 
c    b[272][5][2] = 23132 b[272][5][1] = 23133 b[272][5][0] = 23134 

c    b[273][1][2] = 23135 b[273][1][1] = 23136 b[273][1][0] = 23137 
c    b[273][2][2] = 23138 b[273][2][1] = 23139 b[273][2][0] = 23140 
c    b[273][3][2] = 23141 b[273][3][1] = 23142 b[273][3][0] = 23143 
c    b[273][4][2] = 23144 b[273][4][1] = 23145 b[273][4][0] = 23146 
c    b[273][5][2] = 23147 b[273][5][1] = 23148 b[273][5][0] = 23149 

c    b[274][1][2] = 23150 b[274][1][1] = 23151 b[274][1][0] = 23152 
c    b[274][2][2] = 23153 b[274][2][1] = 23154 b[274][2][0] = 23155 
c    b[274][3][2] = 23156 b[274][3][1] = 23157 b[274][3][0] = 23158 
c    b[274][4][2] = 23159 b[274][4][1] = 23160 b[274][4][0] = 23161 
c    b[274][5][2] = 23162 b[274][5][1] = 23163 b[274][5][0] = 23164 

c    b[275][1][2] = 23165 b[275][1][1] = 23166 b[275][1][0] = 23167 
c    b[275][2][2] = 23168 b[275][2][1] = 23169 b[275][2][0] = 23170 
c    b[275][3][2] = 23171 b[275][3][1] = 23172 b[275][3][0] = 23173 
c    b[275][4][2] = 23174 b[275][4][1] = 23175 b[275][4][0] = 23176 
c    b[275][5][2] = 23177 b[275][5][1] = 23178 b[275][5][0] = 23179 

c    b[276][1][2] = 23180 b[276][1][1] = 23181 b[276][1][0] = 23182 
c    b[276][2][2] = 23183 b[276][2][1] = 23184 b[276][2][0] = 23185 
c    b[276][3][2] = 23186 b[276][3][1] = 23187 b[276][3][0] = 23188 
c    b[276][4][2] = 23189 b[276][4][1] = 23190 b[276][4][0] = 23191 
c    b[276][5][2] = 23192 b[276][5][1] = 23193 b[276][5][0] = 23194 

c    b[277][1][2] = 23195 b[277][1][1] = 23196 b[277][1][0] = 23197 
c    b[277][2][2] = 23198 b[277][2][1] = 23199 b[277][2][0] = 23200 
c    b[277][3][2] = 23201 b[277][3][1] = 23202 b[277][3][0] = 23203 
c    b[277][4][2] = 23204 b[277][4][1] = 23205 b[277][4][0] = 23206 
c    b[277][5][2] = 23207 b[277][5][1] = 23208 b[277][5][0] = 23209 

c    b[278][1][2] = 23210 b[278][1][1] = 23211 b[278][1][0] = 23212 
c    b[278][2][2] = 23213 b[278][2][1] = 23214 b[278][2][0] = 23215 
c    b[278][3][2] = 23216 b[278][3][1] = 23217 b[278][3][0] = 23218 
c    b[278][4][2] = 23219 b[278][4][1] = 23220 b[278][4][0] = 23221 
c    b[278][5][2] = 23222 b[278][5][1] = 23223 b[278][5][0] = 23224 

c    b[279][1][2] = 23225 b[279][1][1] = 23226 b[279][1][0] = 23227 
c    b[279][2][2] = 23228 b[279][2][1] = 23229 b[279][2][0] = 23230 
c    b[279][3][2] = 23231 b[279][3][1] = 23232 b[279][3][0] = 23233 
c    b[279][4][2] = 23234 b[279][4][1] = 23235 b[279][4][0] = 23236 
c    b[279][5][2] = 23237 b[279][5][1] = 23238 b[279][5][0] = 23239 

c    b[280][1][2] = 23240 b[280][1][1] = 23241 b[280][1][0] = 23242 
c    b[280][2][2] = 23243 b[280][2][1] = 23244 b[280][2][0] = 23245 
c    b[280][3][2] = 23246 b[280][3][1] = 23247 b[280][3][0] = 23248 
c    b[280][4][2] = 23249 b[280][4][1] = 23250 b[280][4][0] = 23251 
c    b[280][5][2] = 23252 b[280][5][1] = 23253 b[280][5][0] = 23254 

c    b[281][1][2] = 23255 b[281][1][1] = 23256 b[281][1][0] = 23257 
c    b[281][2][2] = 23258 b[281][2][1] = 23259 b[281][2][0] = 23260 
c    b[281][3][2] = 23261 b[281][3][1] = 23262 b[281][3][0] = 23263 
c    b[281][4][2] = 23264 b[281][4][1] = 23265 b[281][4][0] = 23266 
c    b[281][5][2] = 23267 b[281][5][1] = 23268 b[281][5][0] = 23269 

c    b[282][1][2] = 23270 b[282][1][1] = 23271 b[282][1][0] = 23272 
c    b[282][2][2] = 23273 b[282][2][1] = 23274 b[282][2][0] = 23275 
c    b[282][3][2] = 23276 b[282][3][1] = 23277 b[282][3][0] = 23278 
c    b[282][4][2] = 23279 b[282][4][1] = 23280 b[282][4][0] = 23281 
c    b[282][5][2] = 23282 b[282][5][1] = 23283 b[282][5][0] = 23284 

c    b[283][1][2] = 23285 b[283][1][1] = 23286 b[283][1][0] = 23287 
c    b[283][2][2] = 23288 b[283][2][1] = 23289 b[283][2][0] = 23290 
c    b[283][3][2] = 23291 b[283][3][1] = 23292 b[283][3][0] = 23293 
c    b[283][4][2] = 23294 b[283][4][1] = 23295 b[283][4][0] = 23296 
c    b[283][5][2] = 23297 b[283][5][1] = 23298 b[283][5][0] = 23299 

c    b[284][1][2] = 23300 b[284][1][1] = 23301 b[284][1][0] = 23302 
c    b[284][2][2] = 23303 b[284][2][1] = 23304 b[284][2][0] = 23305 
c    b[284][3][2] = 23306 b[284][3][1] = 23307 b[284][3][0] = 23308 
c    b[284][4][2] = 23309 b[284][4][1] = 23310 b[284][4][0] = 23311 
c    b[284][5][2] = 23312 b[284][5][1] = 23313 b[284][5][0] = 23314 

c    b[285][1][2] = 23315 b[285][1][1] = 23316 b[285][1][0] = 23317 
c    b[285][2][2] = 23318 b[285][2][1] = 23319 b[285][2][0] = 23320 
c    b[285][3][2] = 23321 b[285][3][1] = 23322 b[285][3][0] = 23323 
c    b[285][4][2] = 23324 b[285][4][1] = 23325 b[285][4][0] = 23326 
c    b[285][5][2] = 23327 b[285][5][1] = 23328 b[285][5][0] = 23329 

c    b[286][1][2] = 23330 b[286][1][1] = 23331 b[286][1][0] = 23332 
c    b[286][2][2] = 23333 b[286][2][1] = 23334 b[286][2][0] = 23335 
c    b[286][3][2] = 23336 b[286][3][1] = 23337 b[286][3][0] = 23338 
c    b[286][4][2] = 23339 b[286][4][1] = 23340 b[286][4][0] = 23341 
c    b[286][5][2] = 23342 b[286][5][1] = 23343 b[286][5][0] = 23344 

c    b[287][1][2] = 23345 b[287][1][1] = 23346 b[287][1][0] = 23347 
c    b[287][2][2] = 23348 b[287][2][1] = 23349 b[287][2][0] = 23350 
c    b[287][3][2] = 23351 b[287][3][1] = 23352 b[287][3][0] = 23353 
c    b[287][4][2] = 23354 b[287][4][1] = 23355 b[287][4][0] = 23356 
c    b[287][5][2] = 23357 b[287][5][1] = 23358 b[287][5][0] = 23359 

c    b[288][1][2] = 23360 b[288][1][1] = 23361 b[288][1][0] = 23362 
c    b[288][2][2] = 23363 b[288][2][1] = 23364 b[288][2][0] = 23365 
c    b[288][3][2] = 23366 b[288][3][1] = 23367 b[288][3][0] = 23368 
c    b[288][4][2] = 23369 b[288][4][1] = 23370 b[288][4][0] = 23371 
c    b[288][5][2] = 23372 b[288][5][1] = 23373 b[288][5][0] = 23374 

c    b[289][1][2] = 23375 b[289][1][1] = 23376 b[289][1][0] = 23377 
c    b[289][2][2] = 23378 b[289][2][1] = 23379 b[289][2][0] = 23380 
c    b[289][3][2] = 23381 b[289][3][1] = 23382 b[289][3][0] = 23383 
c    b[289][4][2] = 23384 b[289][4][1] = 23385 b[289][4][0] = 23386 
c    b[289][5][2] = 23387 b[289][5][1] = 23388 b[289][5][0] = 23389 

c    b[290][1][2] = 23390 b[290][1][1] = 23391 b[290][1][0] = 23392 
c    b[290][2][2] = 23393 b[290][2][1] = 23394 b[290][2][0] = 23395 
c    b[290][3][2] = 23396 b[290][3][1] = 23397 b[290][3][0] = 23398 
c    b[290][4][2] = 23399 b[290][4][1] = 23400 b[290][4][0] = 23401 
c    b[290][5][2] = 23402 b[290][5][1] = 23403 b[290][5][0] = 23404 

c    b[291][1][2] = 23405 b[291][1][1] = 23406 b[291][1][0] = 23407 
c    b[291][2][2] = 23408 b[291][2][1] = 23409 b[291][2][0] = 23410 
c    b[291][3][2] = 23411 b[291][3][1] = 23412 b[291][3][0] = 23413 
c    b[291][4][2] = 23414 b[291][4][1] = 23415 b[291][4][0] = 23416 

c    b[292][1][2] = 23417 b[292][1][1] = 23418 b[292][1][0] = 23419 
c    b[292][2][2] = 23420 b[292][2][1] = 23421 b[292][2][0] = 23422 
c    b[292][3][2] = 23423 b[292][3][1] = 23424 b[292][3][0] = 23425 
c    b[292][4][2] = 23426 b[292][4][1] = 23427 b[292][4][0] = 23428 

c    b[293][1][2] = 23429 b[293][1][1] = 23430 b[293][1][0] = 23431 
c    b[293][2][2] = 23432 b[293][2][1] = 23433 b[293][2][0] = 23434 
c    b[293][3][2] = 23435 b[293][3][1] = 23436 b[293][3][0] = 23437 
c    b[293][4][2] = 23438 b[293][4][1] = 23439 b[293][4][0] = 23440 

c    b[294][1][2] = 23441 b[294][1][1] = 23442 b[294][1][0] = 23443 
c    b[294][2][2] = 23444 b[294][2][1] = 23445 b[294][2][0] = 23446 
c    b[294][3][2] = 23447 b[294][3][1] = 23448 b[294][3][0] = 23449 
c    b[294][4][2] = 23450 b[294][4][1] = 23451 b[294][4][0] = 23452 

c    b[295][1][2] = 23453 b[295][1][1] = 23454 b[295][1][0] = 23455 
c    b[295][2][2] = 23456 b[295][2][1] = 23457 b[295][2][0] = 23458 
c    b[295][3][2] = 23459 b[295][3][1] = 23460 b[295][3][0] = 23461 
c    b[295][4][2] = 23462 b[295][4][1] = 23463 b[295][4][0] = 23464 

c    b[296][1][2] = 23465 b[296][1][1] = 23466 b[296][1][0] = 23467 
c    b[296][2][2] = 23468 b[296][2][1] = 23469 b[296][2][0] = 23470 
c    b[296][3][2] = 23471 b[296][3][1] = 23472 b[296][3][0] = 23473 
c    b[296][4][2] = 23474 b[296][4][1] = 23475 b[296][4][0] = 23476 

c    b[297][1][2] = 23477 b[297][1][1] = 23478 b[297][1][0] = 23479 
c    b[297][2][2] = 23480 b[297][2][1] = 23481 b[297][2][0] = 23482 
c    b[297][3][2] = 23483 b[297][3][1] = 23484 b[297][3][0] = 23485 
c    b[297][4][2] = 23486 b[297][4][1] = 23487 b[297][4][0] = 23488 

c    b[298][1][2] = 23489 b[298][1][1] = 23490 b[298][1][0] = 23491 
c    b[298][2][2] = 23492 b[298][2][1] = 23493 b[298][2][0] = 23494 
c    b[298][3][2] = 23495 b[298][3][1] = 23496 b[298][3][0] = 23497 
c    b[298][4][2] = 23498 b[298][4][1] = 23499 b[298][4][0] = 23500 

c    b[299][1][2] = 23501 b[299][1][1] = 23502 b[299][1][0] = 23503 
c    b[299][2][2] = 23504 b[299][2][1] = 23505 b[299][2][0] = 23506 
c    b[299][3][2] = 23507 b[299][3][1] = 23508 b[299][3][0] = 23509 
c    b[299][4][2] = 23510 b[299][4][1] = 23511 b[299][4][0] = 23512 

c    b[300][1][2] = 23513 b[300][1][1] = 23514 b[300][1][0] = 23515 
c    b[300][2][2] = 23516 b[300][2][1] = 23517 b[300][2][0] = 23518 
c    b[300][3][2] = 23519 b[300][3][1] = 23520 b[300][3][0] = 23521 
c    b[300][4][2] = 23522 b[300][4][1] = 23523 b[300][4][0] = 23524 

c    b[301][1][2] = 23525 b[301][1][1] = 23526 b[301][1][0] = 23527 
c    b[301][2][2] = 23528 b[301][2][1] = 23529 b[301][2][0] = 23530 
c    b[301][3][2] = 23531 b[301][3][1] = 23532 b[301][3][0] = 23533 
c    b[301][4][2] = 23534 b[301][4][1] = 23535 b[301][4][0] = 23536 

c    b[302][1][2] = 23537 b[302][1][1] = 23538 b[302][1][0] = 23539 
c    b[302][2][2] = 23540 b[302][2][1] = 23541 b[302][2][0] = 23542 
c    b[302][3][2] = 23543 b[302][3][1] = 23544 b[302][3][0] = 23545 
c    b[302][4][2] = 23546 b[302][4][1] = 23547 b[302][4][0] = 23548 

c    b[303][1][2] = 23549 b[303][1][1] = 23550 b[303][1][0] = 23551 
c    b[303][2][2] = 23552 b[303][2][1] = 23553 b[303][2][0] = 23554 
c    b[303][3][2] = 23555 b[303][3][1] = 23556 b[303][3][0] = 23557 
c    b[303][4][2] = 23558 b[303][4][1] = 23559 b[303][4][0] = 23560 

c    b[304][1][2] = 23561 b[304][1][1] = 23562 b[304][1][0] = 23563 
c    b[304][2][2] = 23564 b[304][2][1] = 23565 b[304][2][0] = 23566 
c    b[304][3][2] = 23567 b[304][3][1] = 23568 b[304][3][0] = 23569 
c    b[304][4][2] = 23570 b[304][4][1] = 23571 b[304][4][0] = 23572 

c    b[305][1][2] = 23573 b[305][1][1] = 23574 b[305][1][0] = 23575 
c    b[305][2][2] = 23576 b[305][2][1] = 23577 b[305][2][0] = 23578 
c    b[305][3][2] = 23579 b[305][3][1] = 23580 b[305][3][0] = 23581 
c    b[305][4][2] = 23582 b[305][4][1] = 23583 b[305][4][0] = 23584 

c    b[306][1][2] = 23585 b[306][1][1] = 23586 b[306][1][0] = 23587 
c    b[306][2][2] = 23588 b[306][2][1] = 23589 b[306][2][0] = 23590 
c    b[306][3][2] = 23591 b[306][3][1] = 23592 b[306][3][0] = 23593 
c    b[306][4][2] = 23594 b[306][4][1] = 23595 b[306][4][0] = 23596 

c    b[307][1][2] = 23597 b[307][1][1] = 23598 b[307][1][0] = 23599 
c    b[307][2][2] = 23600 b[307][2][1] = 23601 b[307][2][0] = 23602 
c    b[307][3][2] = 23603 b[307][3][1] = 23604 b[307][3][0] = 23605 
c    b[307][4][2] = 23606 b[307][4][1] = 23607 b[307][4][0] = 23608 

c    b[308][1][2] = 23609 b[308][1][1] = 23610 b[308][1][0] = 23611 
c    b[308][2][2] = 23612 b[308][2][1] = 23613 b[308][2][0] = 23614 
c    b[308][3][2] = 23615 b[308][3][1] = 23616 b[308][3][0] = 23617 
c    b[308][4][2] = 23618 b[308][4][1] = 23619 b[308][4][0] = 23620 

c    b[309][1][2] = 23621 b[309][1][1] = 23622 b[309][1][0] = 23623 
c    b[309][2][2] = 23624 b[309][2][1] = 23625 b[309][2][0] = 23626 
c    b[309][3][2] = 23627 b[309][3][1] = 23628 b[309][3][0] = 23629 
c    b[309][4][2] = 23630 b[309][4][1] = 23631 b[309][4][0] = 23632 

c    b[310][1][2] = 23633 b[310][1][1] = 23634 b[310][1][0] = 23635 
c    b[310][2][2] = 23636 b[310][2][1] = 23637 b[310][2][0] = 23638 
c    b[310][3][2] = 23639 b[310][3][1] = 23640 b[310][3][0] = 23641 
c    b[310][4][2] = 23642 b[310][4][1] = 23643 b[310][4][0] = 23644 

c    b[311][1][2] = 23645 b[311][1][1] = 23646 b[311][1][0] = 23647 
c    b[311][2][2] = 23648 b[311][2][1] = 23649 b[311][2][0] = 23650 
c    b[311][3][2] = 23651 b[311][3][1] = 23652 b[311][3][0] = 23653 
c    b[311][4][2] = 23654 b[311][4][1] = 23655 b[311][4][0] = 23656 

c    b[312][1][2] = 23657 b[312][1][1] = 23658 b[312][1][0] = 23659 
c    b[312][2][2] = 23660 b[312][2][1] = 23661 b[312][2][0] = 23662 
c    b[312][3][2] = 23663 b[312][3][1] = 23664 b[312][3][0] = 23665 
c    b[312][4][2] = 23666 b[312][4][1] = 23667 b[312][4][0] = 23668 

c    b[313][1][2] = 23669 b[313][1][1] = 23670 b[313][1][0] = 23671 
c    b[313][2][2] = 23672 b[313][2][1] = 23673 b[313][2][0] = 23674 
c    b[313][3][2] = 23675 b[313][3][1] = 23676 b[313][3][0] = 23677 
c    b[313][4][2] = 23678 b[313][4][1] = 23679 b[313][4][0] = 23680 

c    b[314][1][2] = 23681 b[314][1][1] = 23682 b[314][1][0] = 23683 
c    b[314][2][2] = 23684 b[314][2][1] = 23685 b[314][2][0] = 23686 
c    b[314][3][2] = 23687 b[314][3][1] = 23688 b[314][3][0] = 23689 
c    b[314][4][2] = 23690 b[314][4][1] = 23691 b[314][4][0] = 23692 

c    b[315][1][2] = 23693 b[315][1][1] = 23694 b[315][1][0] = 23695 
c    b[315][2][2] = 23696 b[315][2][1] = 23697 b[315][2][0] = 23698 
c    b[315][3][2] = 23699 b[315][3][1] = 23700 b[315][3][0] = 23701 
c    b[315][4][2] = 23702 b[315][4][1] = 23703 b[315][4][0] = 23704 

c    b[316][1][2] = 23705 b[316][1][1] = 23706 b[316][1][0] = 23707 
c    b[316][2][2] = 23708 b[316][2][1] = 23709 b[316][2][0] = 23710 
c    b[316][3][2] = 23711 b[316][3][1] = 23712 b[316][3][0] = 23713 
c    b[316][4][2] = 23714 b[316][4][1] = 23715 b[316][4][0] = 23716 

c    b[317][1][2] = 23717 b[317][1][1] = 23718 b[317][1][0] = 23719 
c    b[317][2][2] = 23720 b[317][2][1] = 23721 b[317][2][0] = 23722 
c    b[317][3][2] = 23723 b[317][3][1] = 23724 b[317][3][0] = 23725 
c    b[317][4][2] = 23726 b[317][4][1] = 23727 b[317][4][0] = 23728 

c    b[318][1][2] = 23729 b[318][1][1] = 23730 b[318][1][0] = 23731 
c    b[318][2][2] = 23732 b[318][2][1] = 23733 b[318][2][0] = 23734 
c    b[318][3][2] = 23735 b[318][3][1] = 23736 b[318][3][0] = 23737 
c    b[318][4][2] = 23738 b[318][4][1] = 23739 b[318][4][0] = 23740 

c    b[319][1][2] = 23741 b[319][1][1] = 23742 b[319][1][0] = 23743 
c    b[319][2][2] = 23744 b[319][2][1] = 23745 b[319][2][0] = 23746 
c    b[319][3][2] = 23747 b[319][3][1] = 23748 b[319][3][0] = 23749 
c    b[319][4][2] = 23750 b[319][4][1] = 23751 b[319][4][0] = 23752 

c    b[320][1][2] = 23753 b[320][1][1] = 23754 b[320][1][0] = 23755 
c    b[320][2][2] = 23756 b[320][2][1] = 23757 b[320][2][0] = 23758 
c    b[320][3][2] = 23759 b[320][3][1] = 23760 b[320][3][0] = 23761 
c    b[320][4][2] = 23762 b[320][4][1] = 23763 b[320][4][0] = 23764 

c    b[321][1][2] = 23765 b[321][1][1] = 23766 b[321][1][0] = 23767 
c    b[321][2][2] = 23768 b[321][2][1] = 23769 b[321][2][0] = 23770 
c    b[321][3][2] = 23771 b[321][3][1] = 23772 b[321][3][0] = 23773 
c    b[321][4][2] = 23774 b[321][4][1] = 23775 b[321][4][0] = 23776 

c    b[322][1][2] = 23777 b[322][1][1] = 23778 b[322][1][0] = 23779 
c    b[322][2][2] = 23780 b[322][2][1] = 23781 b[322][2][0] = 23782 
c    b[322][3][2] = 23783 b[322][3][1] = 23784 b[322][3][0] = 23785 
c    b[322][4][2] = 23786 b[322][4][1] = 23787 b[322][4][0] = 23788 

c    b[323][1][2] = 23789 b[323][1][1] = 23790 b[323][1][0] = 23791 
c    b[323][2][2] = 23792 b[323][2][1] = 23793 b[323][2][0] = 23794 
c    b[323][3][2] = 23795 b[323][3][1] = 23796 b[323][3][0] = 23797 
c    b[323][4][2] = 23798 b[323][4][1] = 23799 b[323][4][0] = 23800 

c    b[324][1][2] = 23801 b[324][1][1] = 23802 b[324][1][0] = 23803 
c    b[324][2][2] = 23804 b[324][2][1] = 23805 b[324][2][0] = 23806 
c    b[324][3][2] = 23807 b[324][3][1] = 23808 b[324][3][0] = 23809 
c    b[324][4][2] = 23810 b[324][4][1] = 23811 b[324][4][0] = 23812 

c    b[325][1][2] = 23813 b[325][1][1] = 23814 b[325][1][0] = 23815 
c    b[325][2][2] = 23816 b[325][2][1] = 23817 b[325][2][0] = 23818 
c    b[325][3][2] = 23819 b[325][3][1] = 23820 b[325][3][0] = 23821 
c    b[325][4][2] = 23822 b[325][4][1] = 23823 b[325][4][0] = 23824 

c    b[326][1][2] = 23825 b[326][1][1] = 23826 b[326][1][0] = 23827 
c    b[326][2][2] = 23828 b[326][2][1] = 23829 b[326][2][0] = 23830 
c    b[326][3][2] = 23831 b[326][3][1] = 23832 b[326][3][0] = 23833 
c    b[326][4][2] = 23834 b[326][4][1] = 23835 b[326][4][0] = 23836 

c    b[327][1][2] = 23837 b[327][1][1] = 23838 b[327][1][0] = 23839 
c    b[327][2][2] = 23840 b[327][2][1] = 23841 b[327][2][0] = 23842 
c    b[327][3][2] = 23843 b[327][3][1] = 23844 b[327][3][0] = 23845 
c    b[327][4][2] = 23846 b[327][4][1] = 23847 b[327][4][0] = 23848 

c    b[328][1][2] = 23849 b[328][1][1] = 23850 b[328][1][0] = 23851 
c    b[328][2][2] = 23852 b[328][2][1] = 23853 b[328][2][0] = 23854 
c    b[328][3][2] = 23855 b[328][3][1] = 23856 b[328][3][0] = 23857 
c    b[328][4][2] = 23858 b[328][4][1] = 23859 b[328][4][0] = 23860 

c    b[329][1][2] = 23861 b[329][1][1] = 23862 b[329][1][0] = 23863 
c    b[329][2][2] = 23864 b[329][2][1] = 23865 b[329][2][0] = 23866 
c    b[329][3][2] = 23867 b[329][3][1] = 23868 b[329][3][0] = 23869 
c    b[329][4][2] = 23870 b[329][4][1] = 23871 b[329][4][0] = 23872 

c    b[330][1][2] = 23873 b[330][1][1] = 23874 b[330][1][0] = 23875 
c    b[330][2][2] = 23876 b[330][2][1] = 23877 b[330][2][0] = 23878 
c    b[330][3][2] = 23879 b[330][3][1] = 23880 b[330][3][0] = 23881 
c    b[330][4][2] = 23882 b[330][4][1] = 23883 b[330][4][0] = 23884 

c    b[331][1][2] = 23885 b[331][1][1] = 23886 b[331][1][0] = 23887 
c    b[331][2][2] = 23888 b[331][2][1] = 23889 b[331][2][0] = 23890 
c    b[331][3][2] = 23891 b[331][3][1] = 23892 b[331][3][0] = 23893 
c    b[331][4][2] = 23894 b[331][4][1] = 23895 b[331][4][0] = 23896 

c    b[332][1][2] = 23897 b[332][1][1] = 23898 b[332][1][0] = 23899 
c    b[332][2][2] = 23900 b[332][2][1] = 23901 b[332][2][0] = 23902 
c    b[332][3][2] = 23903 b[332][3][1] = 23904 b[332][3][0] = 23905 
c    b[332][4][2] = 23906 b[332][4][1] = 23907 b[332][4][0] = 23908 

c    b[333][1][2] = 23909 b[333][1][1] = 23910 b[333][1][0] = 23911 
c    b[333][2][2] = 23912 b[333][2][1] = 23913 b[333][2][0] = 23914 
c    b[333][3][2] = 23915 b[333][3][1] = 23916 b[333][3][0] = 23917 
c    b[333][4][2] = 23918 b[333][4][1] = 23919 b[333][4][0] = 23920 

c    b[334][1][2] = 23921 b[334][1][1] = 23922 b[334][1][0] = 23923 
c    b[334][2][2] = 23924 b[334][2][1] = 23925 b[334][2][0] = 23926 
c    b[334][3][2] = 23927 b[334][3][1] = 23928 b[334][3][0] = 23929 
c    b[334][4][2] = 23930 b[334][4][1] = 23931 b[334][4][0] = 23932 

c    b[335][1][2] = 23933 b[335][1][1] = 23934 b[335][1][0] = 23935 
c    b[335][2][2] = 23936 b[335][2][1] = 23937 b[335][2][0] = 23938 
c    b[335][3][2] = 23939 b[335][3][1] = 23940 b[335][3][0] = 23941 
c    b[335][4][2] = 23942 b[335][4][1] = 23943 b[335][4][0] = 23944 

c    b[336][1][2] = 23945 b[336][1][1] = 23946 b[336][1][0] = 23947 
c    b[336][2][2] = 23948 b[336][2][1] = 23949 b[336][2][0] = 23950 
c    b[336][3][2] = 23951 b[336][3][1] = 23952 b[336][3][0] = 23953 
c    b[336][4][2] = 23954 b[336][4][1] = 23955 b[336][4][0] = 23956 

c    b[337][1][2] = 23957 b[337][1][1] = 23958 b[337][1][0] = 23959 
c    b[337][2][2] = 23960 b[337][2][1] = 23961 b[337][2][0] = 23962 
c    b[337][3][2] = 23963 b[337][3][1] = 23964 b[337][3][0] = 23965 
c    b[337][4][2] = 23966 b[337][4][1] = 23967 b[337][4][0] = 23968 

c    b[338][1][2] = 23969 b[338][1][1] = 23970 b[338][1][0] = 23971 
c    b[338][2][2] = 23972 b[338][2][1] = 23973 b[338][2][0] = 23974 
c    b[338][3][2] = 23975 b[338][3][1] = 23976 b[338][3][0] = 23977 
c    b[338][4][2] = 23978 b[338][4][1] = 23979 b[338][4][0] = 23980 

c    b[339][1][2] = 23981 b[339][1][1] = 23982 b[339][1][0] = 23983 
c    b[339][2][2] = 23984 b[339][2][1] = 23985 b[339][2][0] = 23986 
c    b[339][3][2] = 23987 b[339][3][1] = 23988 b[339][3][0] = 23989 
c    b[339][4][2] = 23990 b[339][4][1] = 23991 b[339][4][0] = 23992 

c    b[340][1][2] = 23993 b[340][1][1] = 23994 b[340][1][0] = 23995 
c    b[340][2][2] = 23996 b[340][2][1] = 23997 b[340][2][0] = 23998 
c    b[340][3][2] = 23999 b[340][3][1] = 24000 b[340][3][0] = 24001 
c    b[340][4][2] = 24002 b[340][4][1] = 24003 b[340][4][0] = 24004 

c    b[341][1][2] = 24005 b[341][1][1] = 24006 b[341][1][0] = 24007 
c    b[341][2][2] = 24008 b[341][2][1] = 24009 b[341][2][0] = 24010 
c    b[341][3][2] = 24011 b[341][3][1] = 24012 b[341][3][0] = 24013 
c    b[341][4][2] = 24014 b[341][4][1] = 24015 b[341][4][0] = 24016 

c    b[342][1][2] = 24017 b[342][1][1] = 24018 b[342][1][0] = 24019 
c    b[342][2][2] = 24020 b[342][2][1] = 24021 b[342][2][0] = 24022 
c    b[342][3][2] = 24023 b[342][3][1] = 24024 b[342][3][0] = 24025 
c    b[342][4][2] = 24026 b[342][4][1] = 24027 b[342][4][0] = 24028 

c    b[343][1][2] = 24029 b[343][1][1] = 24030 b[343][1][0] = 24031 
c    b[343][2][2] = 24032 b[343][2][1] = 24033 b[343][2][0] = 24034 
c    b[343][3][2] = 24035 b[343][3][1] = 24036 b[343][3][0] = 24037 
c    b[343][4][2] = 24038 b[343][4][1] = 24039 b[343][4][0] = 24040 

c    b[344][1][2] = 24041 b[344][1][1] = 24042 b[344][1][0] = 24043 
c    b[344][2][2] = 24044 b[344][2][1] = 24045 b[344][2][0] = 24046 
c    b[344][3][2] = 24047 b[344][3][1] = 24048 b[344][3][0] = 24049 
c    b[344][4][2] = 24050 b[344][4][1] = 24051 b[344][4][0] = 24052 

c    b[345][1][2] = 24053 b[345][1][1] = 24054 b[345][1][0] = 24055 
c    b[345][2][2] = 24056 b[345][2][1] = 24057 b[345][2][0] = 24058 
c    b[345][3][2] = 24059 b[345][3][1] = 24060 b[345][3][0] = 24061 
c    b[345][4][2] = 24062 b[345][4][1] = 24063 b[345][4][0] = 24064 

c    b[346][1][2] = 24065 b[346][1][1] = 24066 b[346][1][0] = 24067 
c    b[346][2][2] = 24068 b[346][2][1] = 24069 b[346][2][0] = 24070 
c    b[346][3][2] = 24071 b[346][3][1] = 24072 b[346][3][0] = 24073 
c    b[346][4][2] = 24074 b[346][4][1] = 24075 b[346][4][0] = 24076 

c    b[347][1][2] = 24077 b[347][1][1] = 24078 b[347][1][0] = 24079 
c    b[347][2][2] = 24080 b[347][2][1] = 24081 b[347][2][0] = 24082 
c    b[347][3][2] = 24083 b[347][3][1] = 24084 b[347][3][0] = 24085 
c    b[347][4][2] = 24086 b[347][4][1] = 24087 b[347][4][0] = 24088 

c    b[348][1][2] = 24089 b[348][1][1] = 24090 b[348][1][0] = 24091 
c    b[348][2][2] = 24092 b[348][2][1] = 24093 b[348][2][0] = 24094 
c    b[348][3][2] = 24095 b[348][3][1] = 24096 b[348][3][0] = 24097 
c    b[348][4][2] = 24098 b[348][4][1] = 24099 b[348][4][0] = 24100 

c    b[349][1][2] = 24101 b[349][1][1] = 24102 b[349][1][0] = 24103 
c    b[349][2][2] = 24104 b[349][2][1] = 24105 b[349][2][0] = 24106 
c    b[349][3][2] = 24107 b[349][3][1] = 24108 b[349][3][0] = 24109 
c    b[349][4][2] = 24110 b[349][4][1] = 24111 b[349][4][0] = 24112 

c    b[350][1][2] = 24113 b[350][1][1] = 24114 b[350][1][0] = 24115 
c    b[350][2][2] = 24116 b[350][2][1] = 24117 b[350][2][0] = 24118 
c    b[350][3][2] = 24119 b[350][3][1] = 24120 b[350][3][0] = 24121 
c    b[350][4][2] = 24122 b[350][4][1] = 24123 b[350][4][0] = 24124 

c    b[351][1][2] = 24125 b[351][1][1] = 24126 b[351][1][0] = 24127 
c    b[351][2][2] = 24128 b[351][2][1] = 24129 b[351][2][0] = 24130 
c    b[351][3][2] = 24131 b[351][3][1] = 24132 b[351][3][0] = 24133 
c    b[351][4][2] = 24134 b[351][4][1] = 24135 b[351][4][0] = 24136 

c    b[352][1][2] = 24137 b[352][1][1] = 24138 b[352][1][0] = 24139 
c    b[352][2][2] = 24140 b[352][2][1] = 24141 b[352][2][0] = 24142 
c    b[352][3][2] = 24143 b[352][3][1] = 24144 b[352][3][0] = 24145 
c    b[352][4][2] = 24146 b[352][4][1] = 24147 b[352][4][0] = 24148 

c    b[353][1][2] = 24149 b[353][1][1] = 24150 b[353][1][0] = 24151 
c    b[353][2][2] = 24152 b[353][2][1] = 24153 b[353][2][0] = 24154 
c    b[353][3][2] = 24155 b[353][3][1] = 24156 b[353][3][0] = 24157 
c    b[353][4][2] = 24158 b[353][4][1] = 24159 b[353][4][0] = 24160 

c    b[354][1][2] = 24161 b[354][1][1] = 24162 b[354][1][0] = 24163 
c    b[354][2][2] = 24164 b[354][2][1] = 24165 b[354][2][0] = 24166 
c    b[354][3][2] = 24167 b[354][3][1] = 24168 b[354][3][0] = 24169 
c    b[354][4][2] = 24170 b[354][4][1] = 24171 b[354][4][0] = 24172 

c    b[355][1][2] = 24173 b[355][1][1] = 24174 b[355][1][0] = 24175 
c    b[355][2][2] = 24176 b[355][2][1] = 24177 b[355][2][0] = 24178 
c    b[355][3][2] = 24179 b[355][3][1] = 24180 b[355][3][0] = 24181 
c    b[355][4][2] = 24182 b[355][4][1] = 24183 b[355][4][0] = 24184 

c    b[356][1][2] = 24185 b[356][1][1] = 24186 b[356][1][0] = 24187 
c    b[356][2][2] = 24188 b[356][2][1] = 24189 b[356][2][0] = 24190 
c    b[356][3][2] = 24191 b[356][3][1] = 24192 b[356][3][0] = 24193 
c    b[356][4][2] = 24194 b[356][4][1] = 24195 b[356][4][0] = 24196 

c    b[357][1][2] = 24197 b[357][1][1] = 24198 b[357][1][0] = 24199 
c    b[357][2][2] = 24200 b[357][2][1] = 24201 b[357][2][0] = 24202 
c    b[357][3][2] = 24203 b[357][3][1] = 24204 b[357][3][0] = 24205 
c    b[357][4][2] = 24206 b[357][4][1] = 24207 b[357][4][0] = 24208 

c    b[358][1][2] = 24209 b[358][1][1] = 24210 b[358][1][0] = 24211 
c    b[358][2][2] = 24212 b[358][2][1] = 24213 b[358][2][0] = 24214 
c    b[358][3][2] = 24215 b[358][3][1] = 24216 b[358][3][0] = 24217 
c    b[358][4][2] = 24218 b[358][4][1] = 24219 b[358][4][0] = 24220 

c    b[359][1][2] = 24221 b[359][1][1] = 24222 b[359][1][0] = 24223 
c    b[359][2][2] = 24224 b[359][2][1] = 24225 b[359][2][0] = 24226 
c    b[359][3][2] = 24227 b[359][3][1] = 24228 b[359][3][0] = 24229 
c    b[359][4][2] = 24230 b[359][4][1] = 24231 b[359][4][0] = 24232 

c    b[360][1][2] = 24233 b[360][1][1] = 24234 b[360][1][0] = 24235 
c    b[360][2][2] = 24236 b[360][2][1] = 24237 b[360][2][0] = 24238 
c    b[360][3][2] = 24239 b[360][3][1] = 24240 b[360][3][0] = 24241 
c    b[360][4][2] = 24242 b[360][4][1] = 24243 b[360][4][0] = 24244 

c    b[361][1][2] = 24245 b[361][1][1] = 24246 b[361][1][0] = 24247 
c    b[361][2][2] = 24248 b[361][2][1] = 24249 b[361][2][0] = 24250 
c    b[361][3][2] = 24251 b[361][3][1] = 24252 b[361][3][0] = 24253 
c    b[361][4][2] = 24254 b[361][4][1] = 24255 b[361][4][0] = 24256 

c    b[362][1][2] = 24257 b[362][1][1] = 24258 b[362][1][0] = 24259 
c    b[362][2][2] = 24260 b[362][2][1] = 24261 b[362][2][0] = 24262 
c    b[362][3][2] = 24263 b[362][3][1] = 24264 b[362][3][0] = 24265 
c    b[362][4][2] = 24266 b[362][4][1] = 24267 b[362][4][0] = 24268 

c    b[363][1][2] = 24269 b[363][1][1] = 24270 b[363][1][0] = 24271 
c    b[363][2][2] = 24272 b[363][2][1] = 24273 b[363][2][0] = 24274 
c    b[363][3][2] = 24275 b[363][3][1] = 24276 b[363][3][0] = 24277 
c    b[363][4][2] = 24278 b[363][4][1] = 24279 b[363][4][0] = 24280 

c    b[364][1][2] = 24281 b[364][1][1] = 24282 b[364][1][0] = 24283 
c    b[364][2][2] = 24284 b[364][2][1] = 24285 b[364][2][0] = 24286 
c    b[364][3][2] = 24287 b[364][3][1] = 24288 b[364][3][0] = 24289 
c    b[364][4][2] = 24290 b[364][4][1] = 24291 b[364][4][0] = 24292 

c    b[365][1][2] = 24293 b[365][1][1] = 24294 b[365][1][0] = 24295 
c    b[365][2][2] = 24296 b[365][2][1] = 24297 b[365][2][0] = 24298 
c    b[365][3][2] = 24299 b[365][3][1] = 24300 b[365][3][0] = 24301 
c    b[365][4][2] = 24302 b[365][4][1] = 24303 b[365][4][0] = 24304 

c    b[366][1][2] = 24305 b[366][1][1] = 24306 b[366][1][0] = 24307 
c    b[366][2][2] = 24308 b[366][2][1] = 24309 b[366][2][0] = 24310 
c    b[366][3][2] = 24311 b[366][3][1] = 24312 b[366][3][0] = 24313 
c    b[366][4][2] = 24314 b[366][4][1] = 24315 b[366][4][0] = 24316 

c    b[367][1][2] = 24317 b[367][1][1] = 24318 b[367][1][0] = 24319 
c    b[367][2][2] = 24320 b[367][2][1] = 24321 b[367][2][0] = 24322 
c    b[367][3][2] = 24323 b[367][3][1] = 24324 b[367][3][0] = 24325 
c    b[367][4][2] = 24326 b[367][4][1] = 24327 b[367][4][0] = 24328 

c    b[368][1][2] = 24329 b[368][1][1] = 24330 b[368][1][0] = 24331 
c    b[368][2][2] = 24332 b[368][2][1] = 24333 b[368][2][0] = 24334 
c    b[368][3][2] = 24335 b[368][3][1] = 24336 b[368][3][0] = 24337 
c    b[368][4][2] = 24338 b[368][4][1] = 24339 b[368][4][0] = 24340 

c    b[369][1][2] = 24341 b[369][1][1] = 24342 b[369][1][0] = 24343 
c    b[369][2][2] = 24344 b[369][2][1] = 24345 b[369][2][0] = 24346 
c    b[369][3][2] = 24347 b[369][3][1] = 24348 b[369][3][0] = 24349 
c    b[369][4][2] = 24350 b[369][4][1] = 24351 b[369][4][0] = 24352 

c    b[370][1][2] = 24353 b[370][1][1] = 24354 b[370][1][0] = 24355 
c    b[370][2][2] = 24356 b[370][2][1] = 24357 b[370][2][0] = 24358 
c    b[370][3][2] = 24359 b[370][3][1] = 24360 b[370][3][0] = 24361 
c    b[370][4][2] = 24362 b[370][4][1] = 24363 b[370][4][0] = 24364 

c    b[371][1][2] = 24365 b[371][1][1] = 24366 b[371][1][0] = 24367 
c    b[371][2][2] = 24368 b[371][2][1] = 24369 b[371][2][0] = 24370 
c    b[371][3][2] = 24371 b[371][3][1] = 24372 b[371][3][0] = 24373 
c    b[371][4][2] = 24374 b[371][4][1] = 24375 b[371][4][0] = 24376 

c    b[372][1][2] = 24377 b[372][1][1] = 24378 b[372][1][0] = 24379 
c    b[372][2][2] = 24380 b[372][2][1] = 24381 b[372][2][0] = 24382 
c    b[372][3][2] = 24383 b[372][3][1] = 24384 b[372][3][0] = 24385 
c    b[372][4][2] = 24386 b[372][4][1] = 24387 b[372][4][0] = 24388 

c    b[373][1][2] = 24389 b[373][1][1] = 24390 b[373][1][0] = 24391 
c    b[373][2][2] = 24392 b[373][2][1] = 24393 b[373][2][0] = 24394 
c    b[373][3][2] = 24395 b[373][3][1] = 24396 b[373][3][0] = 24397 
c    b[373][4][2] = 24398 b[373][4][1] = 24399 b[373][4][0] = 24400 

c    b[374][1][2] = 24401 b[374][1][1] = 24402 b[374][1][0] = 24403 
c    b[374][2][2] = 24404 b[374][2][1] = 24405 b[374][2][0] = 24406 
c    b[374][3][2] = 24407 b[374][3][1] = 24408 b[374][3][0] = 24409 
c    b[374][4][2] = 24410 b[374][4][1] = 24411 b[374][4][0] = 24412 

c    b[375][1][2] = 24413 b[375][1][1] = 24414 b[375][1][0] = 24415 
c    b[375][2][2] = 24416 b[375][2][1] = 24417 b[375][2][0] = 24418 
c    b[375][3][2] = 24419 b[375][3][1] = 24420 b[375][3][0] = 24421 
c    b[375][4][2] = 24422 b[375][4][1] = 24423 b[375][4][0] = 24424 

c    b[376][1][2] = 24425 b[376][1][1] = 24426 b[376][1][0] = 24427 
c    b[376][2][2] = 24428 b[376][2][1] = 24429 b[376][2][0] = 24430 
c    b[376][3][2] = 24431 b[376][3][1] = 24432 b[376][3][0] = 24433 
c    b[376][4][2] = 24434 b[376][4][1] = 24435 b[376][4][0] = 24436 

c    b[377][1][2] = 24437 b[377][1][1] = 24438 b[377][1][0] = 24439 
c    b[377][2][2] = 24440 b[377][2][1] = 24441 b[377][2][0] = 24442 
c    b[377][3][2] = 24443 b[377][3][1] = 24444 b[377][3][0] = 24445 
c    b[377][4][2] = 24446 b[377][4][1] = 24447 b[377][4][0] = 24448 

c    b[378][1][2] = 24449 b[378][1][1] = 24450 b[378][1][0] = 24451 
c    b[378][2][2] = 24452 b[378][2][1] = 24453 b[378][2][0] = 24454 
c    b[378][3][2] = 24455 b[378][3][1] = 24456 b[378][3][0] = 24457 
c    b[378][4][2] = 24458 b[378][4][1] = 24459 b[378][4][0] = 24460 

c    b[379][1][2] = 24461 b[379][1][1] = 24462 b[379][1][0] = 24463 
c    b[379][2][2] = 24464 b[379][2][1] = 24465 b[379][2][0] = 24466 
c    b[379][3][2] = 24467 b[379][3][1] = 24468 b[379][3][0] = 24469 
c    b[379][4][2] = 24470 b[379][4][1] = 24471 b[379][4][0] = 24472 

c    b[380][1][2] = 24473 b[380][1][1] = 24474 b[380][1][0] = 24475 
c    b[380][2][2] = 24476 b[380][2][1] = 24477 b[380][2][0] = 24478 
c    b[380][3][2] = 24479 b[380][3][1] = 24480 b[380][3][0] = 24481 
c    b[380][4][2] = 24482 b[380][4][1] = 24483 b[380][4][0] = 24484 

c    b[381][1][2] = 24485 b[381][1][1] = 24486 b[381][1][0] = 24487 
c    b[381][2][2] = 24488 b[381][2][1] = 24489 b[381][2][0] = 24490 
c    b[381][3][2] = 24491 b[381][3][1] = 24492 b[381][3][0] = 24493 
c    b[381][4][2] = 24494 b[381][4][1] = 24495 b[381][4][0] = 24496 

c    b[382][1][2] = 24497 b[382][1][1] = 24498 b[382][1][0] = 24499 
c    b[382][2][2] = 24500 b[382][2][1] = 24501 b[382][2][0] = 24502 
c    b[382][3][2] = 24503 b[382][3][1] = 24504 b[382][3][0] = 24505 
c    b[382][4][2] = 24506 b[382][4][1] = 24507 b[382][4][0] = 24508 

c    b[383][1][2] = 24509 b[383][1][1] = 24510 b[383][1][0] = 24511 
c    b[383][2][2] = 24512 b[383][2][1] = 24513 b[383][2][0] = 24514 
c    b[383][3][2] = 24515 b[383][3][1] = 24516 b[383][3][0] = 24517 
c    b[383][4][2] = 24518 b[383][4][1] = 24519 b[383][4][0] = 24520 

c    b[384][1][2] = 24521 b[384][1][1] = 24522 b[384][1][0] = 24523 
c    b[384][2][2] = 24524 b[384][2][1] = 24525 b[384][2][0] = 24526 
c    b[384][3][2] = 24527 b[384][3][1] = 24528 b[384][3][0] = 24529 
c    b[384][4][2] = 24530 b[384][4][1] = 24531 b[384][4][0] = 24532 

c    b[385][1][2] = 24533 b[385][1][1] = 24534 b[385][1][0] = 24535 
c    b[385][2][2] = 24536 b[385][2][1] = 24537 b[385][2][0] = 24538 
c    b[385][3][2] = 24539 b[385][3][1] = 24540 b[385][3][0] = 24541 
c    b[385][4][2] = 24542 b[385][4][1] = 24543 b[385][4][0] = 24544 

c    b[386][1][2] = 24545 b[386][1][1] = 24546 b[386][1][0] = 24547 
c    b[386][2][2] = 24548 b[386][2][1] = 24549 b[386][2][0] = 24550 
c    b[386][3][2] = 24551 b[386][3][1] = 24552 b[386][3][0] = 24553 
c    b[386][4][2] = 24554 b[386][4][1] = 24555 b[386][4][0] = 24556 

c    b[387][1][2] = 24557 b[387][1][1] = 24558 b[387][1][0] = 24559 
c    b[387][2][2] = 24560 b[387][2][1] = 24561 b[387][2][0] = 24562 
c    b[387][3][2] = 24563 b[387][3][1] = 24564 b[387][3][0] = 24565 
c    b[387][4][2] = 24566 b[387][4][1] = 24567 b[387][4][0] = 24568 

p cnf 24568 216197


c Automaton should not be broken 
c    -break 
-1162 0

c INIT for k = 1
c    -b^{1, 1}_2
c    -b^{1, 1}_1
c    -b^{1, 1}_0
c  in DIMACS:
-1163 0
-1164 0
-1165 0

c Transitions for k = 1
c i = 1
c  -2+1 --> -1
c    ( b^{1, 1}_2 ∧  b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧  p_1) -> ( b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0)
c  in CNF:
c    -b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨  b^{1, 2}_2
c    -b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_1
c    -b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨  b^{1, 2}_0
c  in DIMACS:
-1163 -1164  1165 -1  1166 0
-1163 -1164  1165 -1 -1167 0
-1163 -1164  1165 -1  1168 0

c  -1+1 --> 0
c    ( b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧  b^{1, 1}_0 ∧  p_1) -> (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧ -b^{1, 2}_0)
c  in CNF:
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_2
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_1
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_0
c  in DIMACS:
-1163  1164 -1165 -1 -1166 0
-1163  1164 -1165 -1 -1167 0
-1163  1164 -1165 -1 -1168 0

c  0+1 --> 1
c    (-b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧  p_1) -> (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0)
c  in CNF:
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_2
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_1
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨  b^{1, 2}_0
c  in DIMACS:
 1163  1164  1165 -1 -1166 0
 1163  1164  1165 -1 -1167 0
 1163  1164  1165 -1  1168 0

c  1+1 --> 2
c    (-b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧  b^{1, 1}_0 ∧  p_1) -> (-b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0)
c  in CNF:
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_2
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨  b^{1, 2}_1
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ -p_1 ∨ -b^{1, 2}_0
c  in DIMACS:
 1163  1164 -1165 -1 -1166 0
 1163  1164 -1165 -1  1167 0
 1163  1164 -1165 -1 -1168 0

c  2+1 --> break 
c    (-b^{1, 1}_2 ∧  b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧  p_1) -> break
c  in CNF:
c     b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ -p_1 ∨ break
c  in DIMACS:
 1163 -1164  1165 -1 1162 0


c  2-1 --> 1
c    (-b^{1, 1}_2 ∧  b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧ -p_1) -> (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0)
c  in CNF:
c     b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_2
c     b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_1
c     b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨  b^{1, 2}_0
c  in DIMACS:
 1163 -1164  1165  1 -1166 0
 1163 -1164  1165  1 -1167 0
 1163 -1164  1165  1  1168 0

c  1-1 --> 0
c    (-b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧  b^{1, 1}_0 ∧ -p_1) -> (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧ -b^{1, 2}_0)
c  in CNF:
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_2
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_1
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_0
c  in DIMACS:
 1163  1164 -1165  1 -1166 0
 1163  1164 -1165  1 -1167 0
 1163  1164 -1165  1 -1168 0

c  0-1 --> -1
c    (-b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧ -p_1) -> ( b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0)
c  in CNF:
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨  b^{1, 2}_2
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_1
c     b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨  b^{1, 2}_0
c  in DIMACS:
 1163  1164  1165  1  1166 0
 1163  1164  1165  1 -1167 0
 1163  1164  1165  1  1168 0

c  -1-1 --> -2
c    ( b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧  b^{1, 1}_0 ∧ -p_1) -> ( b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0)
c  in CNF:
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨  b^{1, 2}_2
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨  b^{1, 2}_1
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨  p_1 ∨ -b^{1, 2}_0
c  in DIMACS:
-1163  1164 -1165  1  1166 0
-1163  1164 -1165  1  1167 0
-1163  1164 -1165  1 -1168 0

c  -2-1 --> break 
c    ( b^{1, 1}_2 ∧  b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧ -p_1) -> break
c  in CNF:
c    -b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨  b^{1, 1}_0 ∨  p_1 ∨ break
c  in DIMACS:
-1163 -1164  1165  1 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1}_2 ∧ -b^{1, 1}_1 ∧ -b^{1, 1}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1}_2 ∨  b^{1, 1}_1 ∨  b^{1, 1}_0 ∨ false 
c  in DIMACS:
-1163  1164  1165  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1}_2 ∧  b^{1, 1}_1 ∧  b^{1, 1}_0 ∧ true) 
c  in CNF:
c     b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ false 
c  in DIMACS:
 1163 -1164 -1165  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1}_2 ∧  b^{1, 1}_1 ∧  b^{1, 1}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1}_2 ∨ -b^{1, 1}_1 ∨ -b^{1, 1}_0 ∨ false 
c  in DIMACS:
-1163 -1164 -1165  0

c i = 2
c  -2+1 --> -1
c    ( b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧  p_2) -> ( b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0)
c  in CNF:
c    -b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨  b^{1, 3}_2
c    -b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_1
c    -b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨  b^{1, 3}_0
c  in DIMACS:
-1166 -1167  1168 -2  1169 0
-1166 -1167  1168 -2 -1170 0
-1166 -1167  1168 -2  1171 0

c  -1+1 --> 0
c    ( b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0 ∧  p_2) -> (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧ -b^{1, 3}_0)
c  in CNF:
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_2
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_1
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_0
c  in DIMACS:
-1166  1167 -1168 -2 -1169 0
-1166  1167 -1168 -2 -1170 0
-1166  1167 -1168 -2 -1171 0

c  0+1 --> 1
c    (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧  p_2) -> (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0)
c  in CNF:
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_2
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_1
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨  b^{1, 3}_0
c  in DIMACS:
 1166  1167  1168 -2 -1169 0
 1166  1167  1168 -2 -1170 0
 1166  1167  1168 -2  1171 0

c  1+1 --> 2
c    (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0 ∧  p_2) -> (-b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0)
c  in CNF:
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_2
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨  b^{1, 3}_1
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ -p_2 ∨ -b^{1, 3}_0
c  in DIMACS:
 1166  1167 -1168 -2 -1169 0
 1166  1167 -1168 -2  1170 0
 1166  1167 -1168 -2 -1171 0

c  2+1 --> break 
c    (-b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧  p_2) -> break
c  in CNF:
c     b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ -p_2 ∨ break
c  in DIMACS:
 1166 -1167  1168 -2 1162 0


c  2-1 --> 1
c    (-b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧ -p_2) -> (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0)
c  in CNF:
c     b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_2
c     b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_1
c     b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨  b^{1, 3}_0
c  in DIMACS:
 1166 -1167  1168  2 -1169 0
 1166 -1167  1168  2 -1170 0
 1166 -1167  1168  2  1171 0

c  1-1 --> 0
c    (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0 ∧ -p_2) -> (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧ -b^{1, 3}_0)
c  in CNF:
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_2
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_1
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_0
c  in DIMACS:
 1166  1167 -1168  2 -1169 0
 1166  1167 -1168  2 -1170 0
 1166  1167 -1168  2 -1171 0

c  0-1 --> -1
c    (-b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧ -p_2) -> ( b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0)
c  in CNF:
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨  b^{1, 3}_2
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_1
c     b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨  b^{1, 3}_0
c  in DIMACS:
 1166  1167  1168  2  1169 0
 1166  1167  1168  2 -1170 0
 1166  1167  1168  2  1171 0

c  -1-1 --> -2
c    ( b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧  b^{1, 2}_0 ∧ -p_2) -> ( b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0)
c  in CNF:
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨  b^{1, 3}_2
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨  b^{1, 3}_1
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨  p_2 ∨ -b^{1, 3}_0
c  in DIMACS:
-1166  1167 -1168  2  1169 0
-1166  1167 -1168  2  1170 0
-1166  1167 -1168  2 -1171 0

c  -2-1 --> break 
c    ( b^{1, 2}_2 ∧  b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧ -p_2) -> break
c  in CNF:
c    -b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨  b^{1, 2}_0 ∨  p_2 ∨ break
c  in DIMACS:
-1166 -1167  1168  2 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 2}_2 ∧ -b^{1, 2}_1 ∧ -b^{1, 2}_0 ∧ true) 
c  in CNF:
c    -b^{1, 2}_2 ∨  b^{1, 2}_1 ∨  b^{1, 2}_0 ∨ false 
c  in DIMACS:
-1166  1167  1168  0

c  3 does not represent an automaton state.
c    -(-b^{1, 2}_2 ∧  b^{1, 2}_1 ∧  b^{1, 2}_0 ∧ true) 
c  in CNF:
c     b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ false 
c  in DIMACS:
 1166 -1167 -1168  0
c  -3 does not represent an automaton state.
c    -( b^{1, 2}_2 ∧  b^{1, 2}_1 ∧  b^{1, 2}_0 ∧ true) 
c  in CNF:
c    -b^{1, 2}_2 ∨ -b^{1, 2}_1 ∨ -b^{1, 2}_0 ∨ false 
c  in DIMACS:
-1166 -1167 -1168  0

c i = 3
c  -2+1 --> -1
c    ( b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧  p_3) -> ( b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0)
c  in CNF:
c    -b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨  b^{1, 4}_2
c    -b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_1
c    -b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨  b^{1, 4}_0
c  in DIMACS:
-1169 -1170  1171 -3  1172 0
-1169 -1170  1171 -3 -1173 0
-1169 -1170  1171 -3  1174 0

c  -1+1 --> 0
c    ( b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0 ∧  p_3) -> (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧ -b^{1, 4}_0)
c  in CNF:
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_2
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_1
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_0
c  in DIMACS:
-1169  1170 -1171 -3 -1172 0
-1169  1170 -1171 -3 -1173 0
-1169  1170 -1171 -3 -1174 0

c  0+1 --> 1
c    (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧  p_3) -> (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0)
c  in CNF:
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_2
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_1
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨  b^{1, 4}_0
c  in DIMACS:
 1169  1170  1171 -3 -1172 0
 1169  1170  1171 -3 -1173 0
 1169  1170  1171 -3  1174 0

c  1+1 --> 2
c    (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0 ∧  p_3) -> (-b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0)
c  in CNF:
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_2
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨  b^{1, 4}_1
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ -p_3 ∨ -b^{1, 4}_0
c  in DIMACS:
 1169  1170 -1171 -3 -1172 0
 1169  1170 -1171 -3  1173 0
 1169  1170 -1171 -3 -1174 0

c  2+1 --> break 
c    (-b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧  p_3) -> break
c  in CNF:
c     b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ -p_3 ∨ break
c  in DIMACS:
 1169 -1170  1171 -3 1162 0


c  2-1 --> 1
c    (-b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧ -p_3) -> (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0)
c  in CNF:
c     b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_2
c     b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_1
c     b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨  b^{1, 4}_0
c  in DIMACS:
 1169 -1170  1171  3 -1172 0
 1169 -1170  1171  3 -1173 0
 1169 -1170  1171  3  1174 0

c  1-1 --> 0
c    (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0 ∧ -p_3) -> (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧ -b^{1, 4}_0)
c  in CNF:
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_2
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_1
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_0
c  in DIMACS:
 1169  1170 -1171  3 -1172 0
 1169  1170 -1171  3 -1173 0
 1169  1170 -1171  3 -1174 0

c  0-1 --> -1
c    (-b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧ -p_3) -> ( b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0)
c  in CNF:
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨  b^{1, 4}_2
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_1
c     b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨  b^{1, 4}_0
c  in DIMACS:
 1169  1170  1171  3  1172 0
 1169  1170  1171  3 -1173 0
 1169  1170  1171  3  1174 0

c  -1-1 --> -2
c    ( b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧  b^{1, 3}_0 ∧ -p_3) -> ( b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0)
c  in CNF:
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨  b^{1, 4}_2
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨  b^{1, 4}_1
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨  p_3 ∨ -b^{1, 4}_0
c  in DIMACS:
-1169  1170 -1171  3  1172 0
-1169  1170 -1171  3  1173 0
-1169  1170 -1171  3 -1174 0

c  -2-1 --> break 
c    ( b^{1, 3}_2 ∧  b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧ -p_3) -> break
c  in CNF:
c    -b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨  b^{1, 3}_0 ∨  p_3 ∨ break
c  in DIMACS:
-1169 -1170  1171  3 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 3}_2 ∧ -b^{1, 3}_1 ∧ -b^{1, 3}_0 ∧ true) 
c  in CNF:
c    -b^{1, 3}_2 ∨  b^{1, 3}_1 ∨  b^{1, 3}_0 ∨ false 
c  in DIMACS:
-1169  1170  1171  0

c  3 does not represent an automaton state.
c    -(-b^{1, 3}_2 ∧  b^{1, 3}_1 ∧  b^{1, 3}_0 ∧ true) 
c  in CNF:
c     b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ false 
c  in DIMACS:
 1169 -1170 -1171  0
c  -3 does not represent an automaton state.
c    -( b^{1, 3}_2 ∧  b^{1, 3}_1 ∧  b^{1, 3}_0 ∧ true) 
c  in CNF:
c    -b^{1, 3}_2 ∨ -b^{1, 3}_1 ∨ -b^{1, 3}_0 ∨ false 
c  in DIMACS:
-1169 -1170 -1171  0

c i = 4
c  -2+1 --> -1
c    ( b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧  p_4) -> ( b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0)
c  in CNF:
c    -b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨  b^{1, 5}_2
c    -b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_1
c    -b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨  b^{1, 5}_0
c  in DIMACS:
-1172 -1173  1174 -4  1175 0
-1172 -1173  1174 -4 -1176 0
-1172 -1173  1174 -4  1177 0

c  -1+1 --> 0
c    ( b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0 ∧  p_4) -> (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧ -b^{1, 5}_0)
c  in CNF:
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_2
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_1
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_0
c  in DIMACS:
-1172  1173 -1174 -4 -1175 0
-1172  1173 -1174 -4 -1176 0
-1172  1173 -1174 -4 -1177 0

c  0+1 --> 1
c    (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧  p_4) -> (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0)
c  in CNF:
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_2
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_1
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨  b^{1, 5}_0
c  in DIMACS:
 1172  1173  1174 -4 -1175 0
 1172  1173  1174 -4 -1176 0
 1172  1173  1174 -4  1177 0

c  1+1 --> 2
c    (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0 ∧  p_4) -> (-b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0)
c  in CNF:
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_2
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨  b^{1, 5}_1
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ -p_4 ∨ -b^{1, 5}_0
c  in DIMACS:
 1172  1173 -1174 -4 -1175 0
 1172  1173 -1174 -4  1176 0
 1172  1173 -1174 -4 -1177 0

c  2+1 --> break 
c    (-b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧  p_4) -> break
c  in CNF:
c     b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ -p_4 ∨ break
c  in DIMACS:
 1172 -1173  1174 -4 1162 0


c  2-1 --> 1
c    (-b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧ -p_4) -> (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0)
c  in CNF:
c     b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_2
c     b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_1
c     b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨  b^{1, 5}_0
c  in DIMACS:
 1172 -1173  1174  4 -1175 0
 1172 -1173  1174  4 -1176 0
 1172 -1173  1174  4  1177 0

c  1-1 --> 0
c    (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0 ∧ -p_4) -> (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧ -b^{1, 5}_0)
c  in CNF:
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_2
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_1
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_0
c  in DIMACS:
 1172  1173 -1174  4 -1175 0
 1172  1173 -1174  4 -1176 0
 1172  1173 -1174  4 -1177 0

c  0-1 --> -1
c    (-b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧ -p_4) -> ( b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0)
c  in CNF:
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨  b^{1, 5}_2
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_1
c     b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨  b^{1, 5}_0
c  in DIMACS:
 1172  1173  1174  4  1175 0
 1172  1173  1174  4 -1176 0
 1172  1173  1174  4  1177 0

c  -1-1 --> -2
c    ( b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧  b^{1, 4}_0 ∧ -p_4) -> ( b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0)
c  in CNF:
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨  b^{1, 5}_2
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨  b^{1, 5}_1
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨  p_4 ∨ -b^{1, 5}_0
c  in DIMACS:
-1172  1173 -1174  4  1175 0
-1172  1173 -1174  4  1176 0
-1172  1173 -1174  4 -1177 0

c  -2-1 --> break 
c    ( b^{1, 4}_2 ∧  b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧ -p_4) -> break
c  in CNF:
c    -b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨  b^{1, 4}_0 ∨  p_4 ∨ break
c  in DIMACS:
-1172 -1173  1174  4 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 4}_2 ∧ -b^{1, 4}_1 ∧ -b^{1, 4}_0 ∧ true) 
c  in CNF:
c    -b^{1, 4}_2 ∨  b^{1, 4}_1 ∨  b^{1, 4}_0 ∨ false 
c  in DIMACS:
-1172  1173  1174  0

c  3 does not represent an automaton state.
c    -(-b^{1, 4}_2 ∧  b^{1, 4}_1 ∧  b^{1, 4}_0 ∧ true) 
c  in CNF:
c     b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ false 
c  in DIMACS:
 1172 -1173 -1174  0
c  -3 does not represent an automaton state.
c    -( b^{1, 4}_2 ∧  b^{1, 4}_1 ∧  b^{1, 4}_0 ∧ true) 
c  in CNF:
c    -b^{1, 4}_2 ∨ -b^{1, 4}_1 ∨ -b^{1, 4}_0 ∨ false 
c  in DIMACS:
-1172 -1173 -1174  0

c i = 5
c  -2+1 --> -1
c    ( b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧  p_5) -> ( b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0)
c  in CNF:
c    -b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨  b^{1, 6}_2
c    -b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_1
c    -b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨  b^{1, 6}_0
c  in DIMACS:
-1175 -1176  1177 -5  1178 0
-1175 -1176  1177 -5 -1179 0
-1175 -1176  1177 -5  1180 0

c  -1+1 --> 0
c    ( b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0 ∧  p_5) -> (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧ -b^{1, 6}_0)
c  in CNF:
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_2
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_1
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_0
c  in DIMACS:
-1175  1176 -1177 -5 -1178 0
-1175  1176 -1177 -5 -1179 0
-1175  1176 -1177 -5 -1180 0

c  0+1 --> 1
c    (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧  p_5) -> (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0)
c  in CNF:
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_2
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_1
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨  b^{1, 6}_0
c  in DIMACS:
 1175  1176  1177 -5 -1178 0
 1175  1176  1177 -5 -1179 0
 1175  1176  1177 -5  1180 0

c  1+1 --> 2
c    (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0 ∧  p_5) -> (-b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0)
c  in CNF:
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_2
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨  b^{1, 6}_1
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ -p_5 ∨ -b^{1, 6}_0
c  in DIMACS:
 1175  1176 -1177 -5 -1178 0
 1175  1176 -1177 -5  1179 0
 1175  1176 -1177 -5 -1180 0

c  2+1 --> break 
c    (-b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧  p_5) -> break
c  in CNF:
c     b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ -p_5 ∨ break
c  in DIMACS:
 1175 -1176  1177 -5 1162 0


c  2-1 --> 1
c    (-b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧ -p_5) -> (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0)
c  in CNF:
c     b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_2
c     b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_1
c     b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨  b^{1, 6}_0
c  in DIMACS:
 1175 -1176  1177  5 -1178 0
 1175 -1176  1177  5 -1179 0
 1175 -1176  1177  5  1180 0

c  1-1 --> 0
c    (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0 ∧ -p_5) -> (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧ -b^{1, 6}_0)
c  in CNF:
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_2
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_1
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_0
c  in DIMACS:
 1175  1176 -1177  5 -1178 0
 1175  1176 -1177  5 -1179 0
 1175  1176 -1177  5 -1180 0

c  0-1 --> -1
c    (-b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧ -p_5) -> ( b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0)
c  in CNF:
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨  b^{1, 6}_2
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_1
c     b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨  b^{1, 6}_0
c  in DIMACS:
 1175  1176  1177  5  1178 0
 1175  1176  1177  5 -1179 0
 1175  1176  1177  5  1180 0

c  -1-1 --> -2
c    ( b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧  b^{1, 5}_0 ∧ -p_5) -> ( b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0)
c  in CNF:
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨  b^{1, 6}_2
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨  b^{1, 6}_1
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨  p_5 ∨ -b^{1, 6}_0
c  in DIMACS:
-1175  1176 -1177  5  1178 0
-1175  1176 -1177  5  1179 0
-1175  1176 -1177  5 -1180 0

c  -2-1 --> break 
c    ( b^{1, 5}_2 ∧  b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧ -p_5) -> break
c  in CNF:
c    -b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨  b^{1, 5}_0 ∨  p_5 ∨ break
c  in DIMACS:
-1175 -1176  1177  5 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 5}_2 ∧ -b^{1, 5}_1 ∧ -b^{1, 5}_0 ∧ true) 
c  in CNF:
c    -b^{1, 5}_2 ∨  b^{1, 5}_1 ∨  b^{1, 5}_0 ∨ false 
c  in DIMACS:
-1175  1176  1177  0

c  3 does not represent an automaton state.
c    -(-b^{1, 5}_2 ∧  b^{1, 5}_1 ∧  b^{1, 5}_0 ∧ true) 
c  in CNF:
c     b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ false 
c  in DIMACS:
 1175 -1176 -1177  0
c  -3 does not represent an automaton state.
c    -( b^{1, 5}_2 ∧  b^{1, 5}_1 ∧  b^{1, 5}_0 ∧ true) 
c  in CNF:
c    -b^{1, 5}_2 ∨ -b^{1, 5}_1 ∨ -b^{1, 5}_0 ∨ false 
c  in DIMACS:
-1175 -1176 -1177  0

c i = 6
c  -2+1 --> -1
c    ( b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧  p_6) -> ( b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0)
c  in CNF:
c    -b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨  b^{1, 7}_2
c    -b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_1
c    -b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨  b^{1, 7}_0
c  in DIMACS:
-1178 -1179  1180 -6  1181 0
-1178 -1179  1180 -6 -1182 0
-1178 -1179  1180 -6  1183 0

c  -1+1 --> 0
c    ( b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0 ∧  p_6) -> (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧ -b^{1, 7}_0)
c  in CNF:
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_2
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_1
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_0
c  in DIMACS:
-1178  1179 -1180 -6 -1181 0
-1178  1179 -1180 -6 -1182 0
-1178  1179 -1180 -6 -1183 0

c  0+1 --> 1
c    (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧  p_6) -> (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0)
c  in CNF:
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_2
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_1
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨  b^{1, 7}_0
c  in DIMACS:
 1178  1179  1180 -6 -1181 0
 1178  1179  1180 -6 -1182 0
 1178  1179  1180 -6  1183 0

c  1+1 --> 2
c    (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0 ∧  p_6) -> (-b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0)
c  in CNF:
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_2
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨  b^{1, 7}_1
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ -p_6 ∨ -b^{1, 7}_0
c  in DIMACS:
 1178  1179 -1180 -6 -1181 0
 1178  1179 -1180 -6  1182 0
 1178  1179 -1180 -6 -1183 0

c  2+1 --> break 
c    (-b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧  p_6) -> break
c  in CNF:
c     b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ -p_6 ∨ break
c  in DIMACS:
 1178 -1179  1180 -6 1162 0


c  2-1 --> 1
c    (-b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧ -p_6) -> (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0)
c  in CNF:
c     b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_2
c     b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_1
c     b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨  b^{1, 7}_0
c  in DIMACS:
 1178 -1179  1180  6 -1181 0
 1178 -1179  1180  6 -1182 0
 1178 -1179  1180  6  1183 0

c  1-1 --> 0
c    (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0 ∧ -p_6) -> (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧ -b^{1, 7}_0)
c  in CNF:
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_2
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_1
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_0
c  in DIMACS:
 1178  1179 -1180  6 -1181 0
 1178  1179 -1180  6 -1182 0
 1178  1179 -1180  6 -1183 0

c  0-1 --> -1
c    (-b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧ -p_6) -> ( b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0)
c  in CNF:
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨  b^{1, 7}_2
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_1
c     b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨  b^{1, 7}_0
c  in DIMACS:
 1178  1179  1180  6  1181 0
 1178  1179  1180  6 -1182 0
 1178  1179  1180  6  1183 0

c  -1-1 --> -2
c    ( b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧  b^{1, 6}_0 ∧ -p_6) -> ( b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0)
c  in CNF:
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨  b^{1, 7}_2
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨  b^{1, 7}_1
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨  p_6 ∨ -b^{1, 7}_0
c  in DIMACS:
-1178  1179 -1180  6  1181 0
-1178  1179 -1180  6  1182 0
-1178  1179 -1180  6 -1183 0

c  -2-1 --> break 
c    ( b^{1, 6}_2 ∧  b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧ -p_6) -> break
c  in CNF:
c    -b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨  b^{1, 6}_0 ∨  p_6 ∨ break
c  in DIMACS:
-1178 -1179  1180  6 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 6}_2 ∧ -b^{1, 6}_1 ∧ -b^{1, 6}_0 ∧ true) 
c  in CNF:
c    -b^{1, 6}_2 ∨  b^{1, 6}_1 ∨  b^{1, 6}_0 ∨ false 
c  in DIMACS:
-1178  1179  1180  0

c  3 does not represent an automaton state.
c    -(-b^{1, 6}_2 ∧  b^{1, 6}_1 ∧  b^{1, 6}_0 ∧ true) 
c  in CNF:
c     b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ false 
c  in DIMACS:
 1178 -1179 -1180  0
c  -3 does not represent an automaton state.
c    -( b^{1, 6}_2 ∧  b^{1, 6}_1 ∧  b^{1, 6}_0 ∧ true) 
c  in CNF:
c    -b^{1, 6}_2 ∨ -b^{1, 6}_1 ∨ -b^{1, 6}_0 ∨ false 
c  in DIMACS:
-1178 -1179 -1180  0

c i = 7
c  -2+1 --> -1
c    ( b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧  p_7) -> ( b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0)
c  in CNF:
c    -b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨  b^{1, 8}_2
c    -b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_1
c    -b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨  b^{1, 8}_0
c  in DIMACS:
-1181 -1182  1183 -7  1184 0
-1181 -1182  1183 -7 -1185 0
-1181 -1182  1183 -7  1186 0

c  -1+1 --> 0
c    ( b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0 ∧  p_7) -> (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧ -b^{1, 8}_0)
c  in CNF:
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_2
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_1
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_0
c  in DIMACS:
-1181  1182 -1183 -7 -1184 0
-1181  1182 -1183 -7 -1185 0
-1181  1182 -1183 -7 -1186 0

c  0+1 --> 1
c    (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧  p_7) -> (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0)
c  in CNF:
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_2
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_1
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨  b^{1, 8}_0
c  in DIMACS:
 1181  1182  1183 -7 -1184 0
 1181  1182  1183 -7 -1185 0
 1181  1182  1183 -7  1186 0

c  1+1 --> 2
c    (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0 ∧  p_7) -> (-b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0)
c  in CNF:
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_2
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨  b^{1, 8}_1
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ -p_7 ∨ -b^{1, 8}_0
c  in DIMACS:
 1181  1182 -1183 -7 -1184 0
 1181  1182 -1183 -7  1185 0
 1181  1182 -1183 -7 -1186 0

c  2+1 --> break 
c    (-b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧  p_7) -> break
c  in CNF:
c     b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ -p_7 ∨ break
c  in DIMACS:
 1181 -1182  1183 -7 1162 0


c  2-1 --> 1
c    (-b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧ -p_7) -> (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0)
c  in CNF:
c     b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_2
c     b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_1
c     b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨  b^{1, 8}_0
c  in DIMACS:
 1181 -1182  1183  7 -1184 0
 1181 -1182  1183  7 -1185 0
 1181 -1182  1183  7  1186 0

c  1-1 --> 0
c    (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0 ∧ -p_7) -> (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧ -b^{1, 8}_0)
c  in CNF:
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_2
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_1
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_0
c  in DIMACS:
 1181  1182 -1183  7 -1184 0
 1181  1182 -1183  7 -1185 0
 1181  1182 -1183  7 -1186 0

c  0-1 --> -1
c    (-b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧ -p_7) -> ( b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0)
c  in CNF:
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨  b^{1, 8}_2
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_1
c     b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨  b^{1, 8}_0
c  in DIMACS:
 1181  1182  1183  7  1184 0
 1181  1182  1183  7 -1185 0
 1181  1182  1183  7  1186 0

c  -1-1 --> -2
c    ( b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧  b^{1, 7}_0 ∧ -p_7) -> ( b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0)
c  in CNF:
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨  b^{1, 8}_2
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨  b^{1, 8}_1
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨  p_7 ∨ -b^{1, 8}_0
c  in DIMACS:
-1181  1182 -1183  7  1184 0
-1181  1182 -1183  7  1185 0
-1181  1182 -1183  7 -1186 0

c  -2-1 --> break 
c    ( b^{1, 7}_2 ∧  b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧ -p_7) -> break
c  in CNF:
c    -b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨  b^{1, 7}_0 ∨  p_7 ∨ break
c  in DIMACS:
-1181 -1182  1183  7 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 7}_2 ∧ -b^{1, 7}_1 ∧ -b^{1, 7}_0 ∧ true) 
c  in CNF:
c    -b^{1, 7}_2 ∨  b^{1, 7}_1 ∨  b^{1, 7}_0 ∨ false 
c  in DIMACS:
-1181  1182  1183  0

c  3 does not represent an automaton state.
c    -(-b^{1, 7}_2 ∧  b^{1, 7}_1 ∧  b^{1, 7}_0 ∧ true) 
c  in CNF:
c     b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ false 
c  in DIMACS:
 1181 -1182 -1183  0
c  -3 does not represent an automaton state.
c    -( b^{1, 7}_2 ∧  b^{1, 7}_1 ∧  b^{1, 7}_0 ∧ true) 
c  in CNF:
c    -b^{1, 7}_2 ∨ -b^{1, 7}_1 ∨ -b^{1, 7}_0 ∨ false 
c  in DIMACS:
-1181 -1182 -1183  0

c i = 8
c  -2+1 --> -1
c    ( b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧  p_8) -> ( b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0)
c  in CNF:
c    -b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨  b^{1, 9}_2
c    -b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_1
c    -b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨  b^{1, 9}_0
c  in DIMACS:
-1184 -1185  1186 -8  1187 0
-1184 -1185  1186 -8 -1188 0
-1184 -1185  1186 -8  1189 0

c  -1+1 --> 0
c    ( b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0 ∧  p_8) -> (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧ -b^{1, 9}_0)
c  in CNF:
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_2
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_1
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_0
c  in DIMACS:
-1184  1185 -1186 -8 -1187 0
-1184  1185 -1186 -8 -1188 0
-1184  1185 -1186 -8 -1189 0

c  0+1 --> 1
c    (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧  p_8) -> (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0)
c  in CNF:
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_2
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_1
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨  b^{1, 9}_0
c  in DIMACS:
 1184  1185  1186 -8 -1187 0
 1184  1185  1186 -8 -1188 0
 1184  1185  1186 -8  1189 0

c  1+1 --> 2
c    (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0 ∧  p_8) -> (-b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0)
c  in CNF:
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_2
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨  b^{1, 9}_1
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ -p_8 ∨ -b^{1, 9}_0
c  in DIMACS:
 1184  1185 -1186 -8 -1187 0
 1184  1185 -1186 -8  1188 0
 1184  1185 -1186 -8 -1189 0

c  2+1 --> break 
c    (-b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧  p_8) -> break
c  in CNF:
c     b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ -p_8 ∨ break
c  in DIMACS:
 1184 -1185  1186 -8 1162 0


c  2-1 --> 1
c    (-b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧ -p_8) -> (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0)
c  in CNF:
c     b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_2
c     b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_1
c     b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨  b^{1, 9}_0
c  in DIMACS:
 1184 -1185  1186  8 -1187 0
 1184 -1185  1186  8 -1188 0
 1184 -1185  1186  8  1189 0

c  1-1 --> 0
c    (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0 ∧ -p_8) -> (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧ -b^{1, 9}_0)
c  in CNF:
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_2
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_1
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_0
c  in DIMACS:
 1184  1185 -1186  8 -1187 0
 1184  1185 -1186  8 -1188 0
 1184  1185 -1186  8 -1189 0

c  0-1 --> -1
c    (-b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧ -p_8) -> ( b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0)
c  in CNF:
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨  b^{1, 9}_2
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_1
c     b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨  b^{1, 9}_0
c  in DIMACS:
 1184  1185  1186  8  1187 0
 1184  1185  1186  8 -1188 0
 1184  1185  1186  8  1189 0

c  -1-1 --> -2
c    ( b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧  b^{1, 8}_0 ∧ -p_8) -> ( b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0)
c  in CNF:
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨  b^{1, 9}_2
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨  b^{1, 9}_1
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨  p_8 ∨ -b^{1, 9}_0
c  in DIMACS:
-1184  1185 -1186  8  1187 0
-1184  1185 -1186  8  1188 0
-1184  1185 -1186  8 -1189 0

c  -2-1 --> break 
c    ( b^{1, 8}_2 ∧  b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧ -p_8) -> break
c  in CNF:
c    -b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨  b^{1, 8}_0 ∨  p_8 ∨ break
c  in DIMACS:
-1184 -1185  1186  8 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 8}_2 ∧ -b^{1, 8}_1 ∧ -b^{1, 8}_0 ∧ true) 
c  in CNF:
c    -b^{1, 8}_2 ∨  b^{1, 8}_1 ∨  b^{1, 8}_0 ∨ false 
c  in DIMACS:
-1184  1185  1186  0

c  3 does not represent an automaton state.
c    -(-b^{1, 8}_2 ∧  b^{1, 8}_1 ∧  b^{1, 8}_0 ∧ true) 
c  in CNF:
c     b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ false 
c  in DIMACS:
 1184 -1185 -1186  0
c  -3 does not represent an automaton state.
c    -( b^{1, 8}_2 ∧  b^{1, 8}_1 ∧  b^{1, 8}_0 ∧ true) 
c  in CNF:
c    -b^{1, 8}_2 ∨ -b^{1, 8}_1 ∨ -b^{1, 8}_0 ∨ false 
c  in DIMACS:
-1184 -1185 -1186  0

c i = 9
c  -2+1 --> -1
c    ( b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧  p_9) -> ( b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0)
c  in CNF:
c    -b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨  b^{1, 10}_2
c    -b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_1
c    -b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨  b^{1, 10}_0
c  in DIMACS:
-1187 -1188  1189 -9  1190 0
-1187 -1188  1189 -9 -1191 0
-1187 -1188  1189 -9  1192 0

c  -1+1 --> 0
c    ( b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0 ∧  p_9) -> (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧ -b^{1, 10}_0)
c  in CNF:
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_2
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_1
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_0
c  in DIMACS:
-1187  1188 -1189 -9 -1190 0
-1187  1188 -1189 -9 -1191 0
-1187  1188 -1189 -9 -1192 0

c  0+1 --> 1
c    (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧  p_9) -> (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0)
c  in CNF:
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_2
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_1
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨  b^{1, 10}_0
c  in DIMACS:
 1187  1188  1189 -9 -1190 0
 1187  1188  1189 -9 -1191 0
 1187  1188  1189 -9  1192 0

c  1+1 --> 2
c    (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0 ∧  p_9) -> (-b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0)
c  in CNF:
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_2
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨  b^{1, 10}_1
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ -p_9 ∨ -b^{1, 10}_0
c  in DIMACS:
 1187  1188 -1189 -9 -1190 0
 1187  1188 -1189 -9  1191 0
 1187  1188 -1189 -9 -1192 0

c  2+1 --> break 
c    (-b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧  p_9) -> break
c  in CNF:
c     b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ -p_9 ∨ break
c  in DIMACS:
 1187 -1188  1189 -9 1162 0


c  2-1 --> 1
c    (-b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧ -p_9) -> (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0)
c  in CNF:
c     b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_2
c     b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_1
c     b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨  b^{1, 10}_0
c  in DIMACS:
 1187 -1188  1189  9 -1190 0
 1187 -1188  1189  9 -1191 0
 1187 -1188  1189  9  1192 0

c  1-1 --> 0
c    (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0 ∧ -p_9) -> (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧ -b^{1, 10}_0)
c  in CNF:
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_2
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_1
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_0
c  in DIMACS:
 1187  1188 -1189  9 -1190 0
 1187  1188 -1189  9 -1191 0
 1187  1188 -1189  9 -1192 0

c  0-1 --> -1
c    (-b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧ -p_9) -> ( b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0)
c  in CNF:
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨  b^{1, 10}_2
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_1
c     b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨  b^{1, 10}_0
c  in DIMACS:
 1187  1188  1189  9  1190 0
 1187  1188  1189  9 -1191 0
 1187  1188  1189  9  1192 0

c  -1-1 --> -2
c    ( b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧  b^{1, 9}_0 ∧ -p_9) -> ( b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0)
c  in CNF:
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨  b^{1, 10}_2
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨  b^{1, 10}_1
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨  p_9 ∨ -b^{1, 10}_0
c  in DIMACS:
-1187  1188 -1189  9  1190 0
-1187  1188 -1189  9  1191 0
-1187  1188 -1189  9 -1192 0

c  -2-1 --> break 
c    ( b^{1, 9}_2 ∧  b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧ -p_9) -> break
c  in CNF:
c    -b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨  b^{1, 9}_0 ∨  p_9 ∨ break
c  in DIMACS:
-1187 -1188  1189  9 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 9}_2 ∧ -b^{1, 9}_1 ∧ -b^{1, 9}_0 ∧ true) 
c  in CNF:
c    -b^{1, 9}_2 ∨  b^{1, 9}_1 ∨  b^{1, 9}_0 ∨ false 
c  in DIMACS:
-1187  1188  1189  0

c  3 does not represent an automaton state.
c    -(-b^{1, 9}_2 ∧  b^{1, 9}_1 ∧  b^{1, 9}_0 ∧ true) 
c  in CNF:
c     b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ false 
c  in DIMACS:
 1187 -1188 -1189  0
c  -3 does not represent an automaton state.
c    -( b^{1, 9}_2 ∧  b^{1, 9}_1 ∧  b^{1, 9}_0 ∧ true) 
c  in CNF:
c    -b^{1, 9}_2 ∨ -b^{1, 9}_1 ∨ -b^{1, 9}_0 ∨ false 
c  in DIMACS:
-1187 -1188 -1189  0

c i = 10
c  -2+1 --> -1
c    ( b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧  p_10) -> ( b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0)
c  in CNF:
c    -b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨  b^{1, 11}_2
c    -b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_1
c    -b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨  b^{1, 11}_0
c  in DIMACS:
-1190 -1191  1192 -10  1193 0
-1190 -1191  1192 -10 -1194 0
-1190 -1191  1192 -10  1195 0

c  -1+1 --> 0
c    ( b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0 ∧  p_10) -> (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧ -b^{1, 11}_0)
c  in CNF:
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_2
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_1
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_0
c  in DIMACS:
-1190  1191 -1192 -10 -1193 0
-1190  1191 -1192 -10 -1194 0
-1190  1191 -1192 -10 -1195 0

c  0+1 --> 1
c    (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧  p_10) -> (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0)
c  in CNF:
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_2
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_1
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨  b^{1, 11}_0
c  in DIMACS:
 1190  1191  1192 -10 -1193 0
 1190  1191  1192 -10 -1194 0
 1190  1191  1192 -10  1195 0

c  1+1 --> 2
c    (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0 ∧  p_10) -> (-b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0)
c  in CNF:
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_2
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨  b^{1, 11}_1
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ -p_10 ∨ -b^{1, 11}_0
c  in DIMACS:
 1190  1191 -1192 -10 -1193 0
 1190  1191 -1192 -10  1194 0
 1190  1191 -1192 -10 -1195 0

c  2+1 --> break 
c    (-b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧  p_10) -> break
c  in CNF:
c     b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ -p_10 ∨ break
c  in DIMACS:
 1190 -1191  1192 -10 1162 0


c  2-1 --> 1
c    (-b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧ -p_10) -> (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0)
c  in CNF:
c     b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_2
c     b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_1
c     b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨  b^{1, 11}_0
c  in DIMACS:
 1190 -1191  1192  10 -1193 0
 1190 -1191  1192  10 -1194 0
 1190 -1191  1192  10  1195 0

c  1-1 --> 0
c    (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0 ∧ -p_10) -> (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧ -b^{1, 11}_0)
c  in CNF:
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_2
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_1
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_0
c  in DIMACS:
 1190  1191 -1192  10 -1193 0
 1190  1191 -1192  10 -1194 0
 1190  1191 -1192  10 -1195 0

c  0-1 --> -1
c    (-b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧ -p_10) -> ( b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0)
c  in CNF:
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨  b^{1, 11}_2
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_1
c     b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨  b^{1, 11}_0
c  in DIMACS:
 1190  1191  1192  10  1193 0
 1190  1191  1192  10 -1194 0
 1190  1191  1192  10  1195 0

c  -1-1 --> -2
c    ( b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧  b^{1, 10}_0 ∧ -p_10) -> ( b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0)
c  in CNF:
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨  b^{1, 11}_2
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨  b^{1, 11}_1
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨  p_10 ∨ -b^{1, 11}_0
c  in DIMACS:
-1190  1191 -1192  10  1193 0
-1190  1191 -1192  10  1194 0
-1190  1191 -1192  10 -1195 0

c  -2-1 --> break 
c    ( b^{1, 10}_2 ∧  b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧ -p_10) -> break
c  in CNF:
c    -b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨  b^{1, 10}_0 ∨  p_10 ∨ break
c  in DIMACS:
-1190 -1191  1192  10 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 10}_2 ∧ -b^{1, 10}_1 ∧ -b^{1, 10}_0 ∧ true) 
c  in CNF:
c    -b^{1, 10}_2 ∨  b^{1, 10}_1 ∨  b^{1, 10}_0 ∨ false 
c  in DIMACS:
-1190  1191  1192  0

c  3 does not represent an automaton state.
c    -(-b^{1, 10}_2 ∧  b^{1, 10}_1 ∧  b^{1, 10}_0 ∧ true) 
c  in CNF:
c     b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ false 
c  in DIMACS:
 1190 -1191 -1192  0
c  -3 does not represent an automaton state.
c    -( b^{1, 10}_2 ∧  b^{1, 10}_1 ∧  b^{1, 10}_0 ∧ true) 
c  in CNF:
c    -b^{1, 10}_2 ∨ -b^{1, 10}_1 ∨ -b^{1, 10}_0 ∨ false 
c  in DIMACS:
-1190 -1191 -1192  0

c i = 11
c  -2+1 --> -1
c    ( b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧  p_11) -> ( b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0)
c  in CNF:
c    -b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨  b^{1, 12}_2
c    -b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_1
c    -b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨  b^{1, 12}_0
c  in DIMACS:
-1193 -1194  1195 -11  1196 0
-1193 -1194  1195 -11 -1197 0
-1193 -1194  1195 -11  1198 0

c  -1+1 --> 0
c    ( b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0 ∧  p_11) -> (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧ -b^{1, 12}_0)
c  in CNF:
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_2
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_1
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_0
c  in DIMACS:
-1193  1194 -1195 -11 -1196 0
-1193  1194 -1195 -11 -1197 0
-1193  1194 -1195 -11 -1198 0

c  0+1 --> 1
c    (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧  p_11) -> (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0)
c  in CNF:
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_2
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_1
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨  b^{1, 12}_0
c  in DIMACS:
 1193  1194  1195 -11 -1196 0
 1193  1194  1195 -11 -1197 0
 1193  1194  1195 -11  1198 0

c  1+1 --> 2
c    (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0 ∧  p_11) -> (-b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0)
c  in CNF:
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_2
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨  b^{1, 12}_1
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ -p_11 ∨ -b^{1, 12}_0
c  in DIMACS:
 1193  1194 -1195 -11 -1196 0
 1193  1194 -1195 -11  1197 0
 1193  1194 -1195 -11 -1198 0

c  2+1 --> break 
c    (-b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧  p_11) -> break
c  in CNF:
c     b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ -p_11 ∨ break
c  in DIMACS:
 1193 -1194  1195 -11 1162 0


c  2-1 --> 1
c    (-b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧ -p_11) -> (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0)
c  in CNF:
c     b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_2
c     b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_1
c     b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨  b^{1, 12}_0
c  in DIMACS:
 1193 -1194  1195  11 -1196 0
 1193 -1194  1195  11 -1197 0
 1193 -1194  1195  11  1198 0

c  1-1 --> 0
c    (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0 ∧ -p_11) -> (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧ -b^{1, 12}_0)
c  in CNF:
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_2
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_1
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_0
c  in DIMACS:
 1193  1194 -1195  11 -1196 0
 1193  1194 -1195  11 -1197 0
 1193  1194 -1195  11 -1198 0

c  0-1 --> -1
c    (-b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧ -p_11) -> ( b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0)
c  in CNF:
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨  b^{1, 12}_2
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_1
c     b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨  b^{1, 12}_0
c  in DIMACS:
 1193  1194  1195  11  1196 0
 1193  1194  1195  11 -1197 0
 1193  1194  1195  11  1198 0

c  -1-1 --> -2
c    ( b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧  b^{1, 11}_0 ∧ -p_11) -> ( b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0)
c  in CNF:
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨  b^{1, 12}_2
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨  b^{1, 12}_1
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨  p_11 ∨ -b^{1, 12}_0
c  in DIMACS:
-1193  1194 -1195  11  1196 0
-1193  1194 -1195  11  1197 0
-1193  1194 -1195  11 -1198 0

c  -2-1 --> break 
c    ( b^{1, 11}_2 ∧  b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧ -p_11) -> break
c  in CNF:
c    -b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨  b^{1, 11}_0 ∨  p_11 ∨ break
c  in DIMACS:
-1193 -1194  1195  11 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 11}_2 ∧ -b^{1, 11}_1 ∧ -b^{1, 11}_0 ∧ true) 
c  in CNF:
c    -b^{1, 11}_2 ∨  b^{1, 11}_1 ∨  b^{1, 11}_0 ∨ false 
c  in DIMACS:
-1193  1194  1195  0

c  3 does not represent an automaton state.
c    -(-b^{1, 11}_2 ∧  b^{1, 11}_1 ∧  b^{1, 11}_0 ∧ true) 
c  in CNF:
c     b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ false 
c  in DIMACS:
 1193 -1194 -1195  0
c  -3 does not represent an automaton state.
c    -( b^{1, 11}_2 ∧  b^{1, 11}_1 ∧  b^{1, 11}_0 ∧ true) 
c  in CNF:
c    -b^{1, 11}_2 ∨ -b^{1, 11}_1 ∨ -b^{1, 11}_0 ∨ false 
c  in DIMACS:
-1193 -1194 -1195  0

c i = 12
c  -2+1 --> -1
c    ( b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧  p_12) -> ( b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0)
c  in CNF:
c    -b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨  b^{1, 13}_2
c    -b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_1
c    -b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨  b^{1, 13}_0
c  in DIMACS:
-1196 -1197  1198 -12  1199 0
-1196 -1197  1198 -12 -1200 0
-1196 -1197  1198 -12  1201 0

c  -1+1 --> 0
c    ( b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0 ∧  p_12) -> (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧ -b^{1, 13}_0)
c  in CNF:
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_2
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_1
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_0
c  in DIMACS:
-1196  1197 -1198 -12 -1199 0
-1196  1197 -1198 -12 -1200 0
-1196  1197 -1198 -12 -1201 0

c  0+1 --> 1
c    (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧  p_12) -> (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0)
c  in CNF:
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_2
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_1
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨  b^{1, 13}_0
c  in DIMACS:
 1196  1197  1198 -12 -1199 0
 1196  1197  1198 -12 -1200 0
 1196  1197  1198 -12  1201 0

c  1+1 --> 2
c    (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0 ∧  p_12) -> (-b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0)
c  in CNF:
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_2
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨  b^{1, 13}_1
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ -p_12 ∨ -b^{1, 13}_0
c  in DIMACS:
 1196  1197 -1198 -12 -1199 0
 1196  1197 -1198 -12  1200 0
 1196  1197 -1198 -12 -1201 0

c  2+1 --> break 
c    (-b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧  p_12) -> break
c  in CNF:
c     b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 1196 -1197  1198 -12 1162 0


c  2-1 --> 1
c    (-b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧ -p_12) -> (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0)
c  in CNF:
c     b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_2
c     b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_1
c     b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨  b^{1, 13}_0
c  in DIMACS:
 1196 -1197  1198  12 -1199 0
 1196 -1197  1198  12 -1200 0
 1196 -1197  1198  12  1201 0

c  1-1 --> 0
c    (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0 ∧ -p_12) -> (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧ -b^{1, 13}_0)
c  in CNF:
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_2
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_1
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_0
c  in DIMACS:
 1196  1197 -1198  12 -1199 0
 1196  1197 -1198  12 -1200 0
 1196  1197 -1198  12 -1201 0

c  0-1 --> -1
c    (-b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧ -p_12) -> ( b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0)
c  in CNF:
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨  b^{1, 13}_2
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_1
c     b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨  b^{1, 13}_0
c  in DIMACS:
 1196  1197  1198  12  1199 0
 1196  1197  1198  12 -1200 0
 1196  1197  1198  12  1201 0

c  -1-1 --> -2
c    ( b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧  b^{1, 12}_0 ∧ -p_12) -> ( b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0)
c  in CNF:
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨  b^{1, 13}_2
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨  b^{1, 13}_1
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨  p_12 ∨ -b^{1, 13}_0
c  in DIMACS:
-1196  1197 -1198  12  1199 0
-1196  1197 -1198  12  1200 0
-1196  1197 -1198  12 -1201 0

c  -2-1 --> break 
c    ( b^{1, 12}_2 ∧  b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨  b^{1, 12}_0 ∨  p_12 ∨ break
c  in DIMACS:
-1196 -1197  1198  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 12}_2 ∧ -b^{1, 12}_1 ∧ -b^{1, 12}_0 ∧ true) 
c  in CNF:
c    -b^{1, 12}_2 ∨  b^{1, 12}_1 ∨  b^{1, 12}_0 ∨ false 
c  in DIMACS:
-1196  1197  1198  0

c  3 does not represent an automaton state.
c    -(-b^{1, 12}_2 ∧  b^{1, 12}_1 ∧  b^{1, 12}_0 ∧ true) 
c  in CNF:
c     b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ false 
c  in DIMACS:
 1196 -1197 -1198  0
c  -3 does not represent an automaton state.
c    -( b^{1, 12}_2 ∧  b^{1, 12}_1 ∧  b^{1, 12}_0 ∧ true) 
c  in CNF:
c    -b^{1, 12}_2 ∨ -b^{1, 12}_1 ∨ -b^{1, 12}_0 ∨ false 
c  in DIMACS:
-1196 -1197 -1198  0

c i = 13
c  -2+1 --> -1
c    ( b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧  p_13) -> ( b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0)
c  in CNF:
c    -b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨  b^{1, 14}_2
c    -b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_1
c    -b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨  b^{1, 14}_0
c  in DIMACS:
-1199 -1200  1201 -13  1202 0
-1199 -1200  1201 -13 -1203 0
-1199 -1200  1201 -13  1204 0

c  -1+1 --> 0
c    ( b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0 ∧  p_13) -> (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧ -b^{1, 14}_0)
c  in CNF:
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_2
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_1
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_0
c  in DIMACS:
-1199  1200 -1201 -13 -1202 0
-1199  1200 -1201 -13 -1203 0
-1199  1200 -1201 -13 -1204 0

c  0+1 --> 1
c    (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧  p_13) -> (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0)
c  in CNF:
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_2
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_1
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨  b^{1, 14}_0
c  in DIMACS:
 1199  1200  1201 -13 -1202 0
 1199  1200  1201 -13 -1203 0
 1199  1200  1201 -13  1204 0

c  1+1 --> 2
c    (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0 ∧  p_13) -> (-b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0)
c  in CNF:
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_2
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨  b^{1, 14}_1
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ -p_13 ∨ -b^{1, 14}_0
c  in DIMACS:
 1199  1200 -1201 -13 -1202 0
 1199  1200 -1201 -13  1203 0
 1199  1200 -1201 -13 -1204 0

c  2+1 --> break 
c    (-b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧  p_13) -> break
c  in CNF:
c     b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ -p_13 ∨ break
c  in DIMACS:
 1199 -1200  1201 -13 1162 0


c  2-1 --> 1
c    (-b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧ -p_13) -> (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0)
c  in CNF:
c     b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_2
c     b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_1
c     b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨  b^{1, 14}_0
c  in DIMACS:
 1199 -1200  1201  13 -1202 0
 1199 -1200  1201  13 -1203 0
 1199 -1200  1201  13  1204 0

c  1-1 --> 0
c    (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0 ∧ -p_13) -> (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧ -b^{1, 14}_0)
c  in CNF:
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_2
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_1
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_0
c  in DIMACS:
 1199  1200 -1201  13 -1202 0
 1199  1200 -1201  13 -1203 0
 1199  1200 -1201  13 -1204 0

c  0-1 --> -1
c    (-b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧ -p_13) -> ( b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0)
c  in CNF:
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨  b^{1, 14}_2
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_1
c     b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨  b^{1, 14}_0
c  in DIMACS:
 1199  1200  1201  13  1202 0
 1199  1200  1201  13 -1203 0
 1199  1200  1201  13  1204 0

c  -1-1 --> -2
c    ( b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧  b^{1, 13}_0 ∧ -p_13) -> ( b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0)
c  in CNF:
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨  b^{1, 14}_2
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨  b^{1, 14}_1
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨  p_13 ∨ -b^{1, 14}_0
c  in DIMACS:
-1199  1200 -1201  13  1202 0
-1199  1200 -1201  13  1203 0
-1199  1200 -1201  13 -1204 0

c  -2-1 --> break 
c    ( b^{1, 13}_2 ∧  b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧ -p_13) -> break
c  in CNF:
c    -b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨  b^{1, 13}_0 ∨  p_13 ∨ break
c  in DIMACS:
-1199 -1200  1201  13 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 13}_2 ∧ -b^{1, 13}_1 ∧ -b^{1, 13}_0 ∧ true) 
c  in CNF:
c    -b^{1, 13}_2 ∨  b^{1, 13}_1 ∨  b^{1, 13}_0 ∨ false 
c  in DIMACS:
-1199  1200  1201  0

c  3 does not represent an automaton state.
c    -(-b^{1, 13}_2 ∧  b^{1, 13}_1 ∧  b^{1, 13}_0 ∧ true) 
c  in CNF:
c     b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ false 
c  in DIMACS:
 1199 -1200 -1201  0
c  -3 does not represent an automaton state.
c    -( b^{1, 13}_2 ∧  b^{1, 13}_1 ∧  b^{1, 13}_0 ∧ true) 
c  in CNF:
c    -b^{1, 13}_2 ∨ -b^{1, 13}_1 ∨ -b^{1, 13}_0 ∨ false 
c  in DIMACS:
-1199 -1200 -1201  0

c i = 14
c  -2+1 --> -1
c    ( b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧  p_14) -> ( b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0)
c  in CNF:
c    -b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨  b^{1, 15}_2
c    -b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_1
c    -b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨  b^{1, 15}_0
c  in DIMACS:
-1202 -1203  1204 -14  1205 0
-1202 -1203  1204 -14 -1206 0
-1202 -1203  1204 -14  1207 0

c  -1+1 --> 0
c    ( b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0 ∧  p_14) -> (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧ -b^{1, 15}_0)
c  in CNF:
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_2
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_1
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_0
c  in DIMACS:
-1202  1203 -1204 -14 -1205 0
-1202  1203 -1204 -14 -1206 0
-1202  1203 -1204 -14 -1207 0

c  0+1 --> 1
c    (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧  p_14) -> (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0)
c  in CNF:
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_2
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_1
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨  b^{1, 15}_0
c  in DIMACS:
 1202  1203  1204 -14 -1205 0
 1202  1203  1204 -14 -1206 0
 1202  1203  1204 -14  1207 0

c  1+1 --> 2
c    (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0 ∧  p_14) -> (-b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0)
c  in CNF:
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_2
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨  b^{1, 15}_1
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ -p_14 ∨ -b^{1, 15}_0
c  in DIMACS:
 1202  1203 -1204 -14 -1205 0
 1202  1203 -1204 -14  1206 0
 1202  1203 -1204 -14 -1207 0

c  2+1 --> break 
c    (-b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧  p_14) -> break
c  in CNF:
c     b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ -p_14 ∨ break
c  in DIMACS:
 1202 -1203  1204 -14 1162 0


c  2-1 --> 1
c    (-b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧ -p_14) -> (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0)
c  in CNF:
c     b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_2
c     b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_1
c     b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨  b^{1, 15}_0
c  in DIMACS:
 1202 -1203  1204  14 -1205 0
 1202 -1203  1204  14 -1206 0
 1202 -1203  1204  14  1207 0

c  1-1 --> 0
c    (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0 ∧ -p_14) -> (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧ -b^{1, 15}_0)
c  in CNF:
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_2
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_1
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_0
c  in DIMACS:
 1202  1203 -1204  14 -1205 0
 1202  1203 -1204  14 -1206 0
 1202  1203 -1204  14 -1207 0

c  0-1 --> -1
c    (-b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧ -p_14) -> ( b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0)
c  in CNF:
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨  b^{1, 15}_2
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_1
c     b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨  b^{1, 15}_0
c  in DIMACS:
 1202  1203  1204  14  1205 0
 1202  1203  1204  14 -1206 0
 1202  1203  1204  14  1207 0

c  -1-1 --> -2
c    ( b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧  b^{1, 14}_0 ∧ -p_14) -> ( b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0)
c  in CNF:
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨  b^{1, 15}_2
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨  b^{1, 15}_1
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨  p_14 ∨ -b^{1, 15}_0
c  in DIMACS:
-1202  1203 -1204  14  1205 0
-1202  1203 -1204  14  1206 0
-1202  1203 -1204  14 -1207 0

c  -2-1 --> break 
c    ( b^{1, 14}_2 ∧  b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧ -p_14) -> break
c  in CNF:
c    -b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨  b^{1, 14}_0 ∨  p_14 ∨ break
c  in DIMACS:
-1202 -1203  1204  14 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 14}_2 ∧ -b^{1, 14}_1 ∧ -b^{1, 14}_0 ∧ true) 
c  in CNF:
c    -b^{1, 14}_2 ∨  b^{1, 14}_1 ∨  b^{1, 14}_0 ∨ false 
c  in DIMACS:
-1202  1203  1204  0

c  3 does not represent an automaton state.
c    -(-b^{1, 14}_2 ∧  b^{1, 14}_1 ∧  b^{1, 14}_0 ∧ true) 
c  in CNF:
c     b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ false 
c  in DIMACS:
 1202 -1203 -1204  0
c  -3 does not represent an automaton state.
c    -( b^{1, 14}_2 ∧  b^{1, 14}_1 ∧  b^{1, 14}_0 ∧ true) 
c  in CNF:
c    -b^{1, 14}_2 ∨ -b^{1, 14}_1 ∨ -b^{1, 14}_0 ∨ false 
c  in DIMACS:
-1202 -1203 -1204  0

c i = 15
c  -2+1 --> -1
c    ( b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧  p_15) -> ( b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0)
c  in CNF:
c    -b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨  b^{1, 16}_2
c    -b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_1
c    -b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨  b^{1, 16}_0
c  in DIMACS:
-1205 -1206  1207 -15  1208 0
-1205 -1206  1207 -15 -1209 0
-1205 -1206  1207 -15  1210 0

c  -1+1 --> 0
c    ( b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0 ∧  p_15) -> (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧ -b^{1, 16}_0)
c  in CNF:
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_2
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_1
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_0
c  in DIMACS:
-1205  1206 -1207 -15 -1208 0
-1205  1206 -1207 -15 -1209 0
-1205  1206 -1207 -15 -1210 0

c  0+1 --> 1
c    (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧  p_15) -> (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0)
c  in CNF:
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_2
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_1
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨  b^{1, 16}_0
c  in DIMACS:
 1205  1206  1207 -15 -1208 0
 1205  1206  1207 -15 -1209 0
 1205  1206  1207 -15  1210 0

c  1+1 --> 2
c    (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0 ∧  p_15) -> (-b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0)
c  in CNF:
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_2
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨  b^{1, 16}_1
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ -p_15 ∨ -b^{1, 16}_0
c  in DIMACS:
 1205  1206 -1207 -15 -1208 0
 1205  1206 -1207 -15  1209 0
 1205  1206 -1207 -15 -1210 0

c  2+1 --> break 
c    (-b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧  p_15) -> break
c  in CNF:
c     b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ -p_15 ∨ break
c  in DIMACS:
 1205 -1206  1207 -15 1162 0


c  2-1 --> 1
c    (-b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧ -p_15) -> (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0)
c  in CNF:
c     b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_2
c     b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_1
c     b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨  b^{1, 16}_0
c  in DIMACS:
 1205 -1206  1207  15 -1208 0
 1205 -1206  1207  15 -1209 0
 1205 -1206  1207  15  1210 0

c  1-1 --> 0
c    (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0 ∧ -p_15) -> (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧ -b^{1, 16}_0)
c  in CNF:
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_2
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_1
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_0
c  in DIMACS:
 1205  1206 -1207  15 -1208 0
 1205  1206 -1207  15 -1209 0
 1205  1206 -1207  15 -1210 0

c  0-1 --> -1
c    (-b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧ -p_15) -> ( b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0)
c  in CNF:
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨  b^{1, 16}_2
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_1
c     b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨  b^{1, 16}_0
c  in DIMACS:
 1205  1206  1207  15  1208 0
 1205  1206  1207  15 -1209 0
 1205  1206  1207  15  1210 0

c  -1-1 --> -2
c    ( b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧  b^{1, 15}_0 ∧ -p_15) -> ( b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0)
c  in CNF:
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨  b^{1, 16}_2
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨  b^{1, 16}_1
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨  p_15 ∨ -b^{1, 16}_0
c  in DIMACS:
-1205  1206 -1207  15  1208 0
-1205  1206 -1207  15  1209 0
-1205  1206 -1207  15 -1210 0

c  -2-1 --> break 
c    ( b^{1, 15}_2 ∧  b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧ -p_15) -> break
c  in CNF:
c    -b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨  b^{1, 15}_0 ∨  p_15 ∨ break
c  in DIMACS:
-1205 -1206  1207  15 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 15}_2 ∧ -b^{1, 15}_1 ∧ -b^{1, 15}_0 ∧ true) 
c  in CNF:
c    -b^{1, 15}_2 ∨  b^{1, 15}_1 ∨  b^{1, 15}_0 ∨ false 
c  in DIMACS:
-1205  1206  1207  0

c  3 does not represent an automaton state.
c    -(-b^{1, 15}_2 ∧  b^{1, 15}_1 ∧  b^{1, 15}_0 ∧ true) 
c  in CNF:
c     b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ false 
c  in DIMACS:
 1205 -1206 -1207  0
c  -3 does not represent an automaton state.
c    -( b^{1, 15}_2 ∧  b^{1, 15}_1 ∧  b^{1, 15}_0 ∧ true) 
c  in CNF:
c    -b^{1, 15}_2 ∨ -b^{1, 15}_1 ∨ -b^{1, 15}_0 ∨ false 
c  in DIMACS:
-1205 -1206 -1207  0

c i = 16
c  -2+1 --> -1
c    ( b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧  p_16) -> ( b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0)
c  in CNF:
c    -b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨  b^{1, 17}_2
c    -b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_1
c    -b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨  b^{1, 17}_0
c  in DIMACS:
-1208 -1209  1210 -16  1211 0
-1208 -1209  1210 -16 -1212 0
-1208 -1209  1210 -16  1213 0

c  -1+1 --> 0
c    ( b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0 ∧  p_16) -> (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧ -b^{1, 17}_0)
c  in CNF:
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_2
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_1
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_0
c  in DIMACS:
-1208  1209 -1210 -16 -1211 0
-1208  1209 -1210 -16 -1212 0
-1208  1209 -1210 -16 -1213 0

c  0+1 --> 1
c    (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧  p_16) -> (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0)
c  in CNF:
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_2
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_1
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨  b^{1, 17}_0
c  in DIMACS:
 1208  1209  1210 -16 -1211 0
 1208  1209  1210 -16 -1212 0
 1208  1209  1210 -16  1213 0

c  1+1 --> 2
c    (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0 ∧  p_16) -> (-b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0)
c  in CNF:
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_2
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨  b^{1, 17}_1
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ -p_16 ∨ -b^{1, 17}_0
c  in DIMACS:
 1208  1209 -1210 -16 -1211 0
 1208  1209 -1210 -16  1212 0
 1208  1209 -1210 -16 -1213 0

c  2+1 --> break 
c    (-b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧  p_16) -> break
c  in CNF:
c     b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ -p_16 ∨ break
c  in DIMACS:
 1208 -1209  1210 -16 1162 0


c  2-1 --> 1
c    (-b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧ -p_16) -> (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0)
c  in CNF:
c     b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_2
c     b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_1
c     b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨  b^{1, 17}_0
c  in DIMACS:
 1208 -1209  1210  16 -1211 0
 1208 -1209  1210  16 -1212 0
 1208 -1209  1210  16  1213 0

c  1-1 --> 0
c    (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0 ∧ -p_16) -> (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧ -b^{1, 17}_0)
c  in CNF:
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_2
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_1
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_0
c  in DIMACS:
 1208  1209 -1210  16 -1211 0
 1208  1209 -1210  16 -1212 0
 1208  1209 -1210  16 -1213 0

c  0-1 --> -1
c    (-b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧ -p_16) -> ( b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0)
c  in CNF:
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨  b^{1, 17}_2
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_1
c     b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨  b^{1, 17}_0
c  in DIMACS:
 1208  1209  1210  16  1211 0
 1208  1209  1210  16 -1212 0
 1208  1209  1210  16  1213 0

c  -1-1 --> -2
c    ( b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧  b^{1, 16}_0 ∧ -p_16) -> ( b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0)
c  in CNF:
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨  b^{1, 17}_2
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨  b^{1, 17}_1
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨  p_16 ∨ -b^{1, 17}_0
c  in DIMACS:
-1208  1209 -1210  16  1211 0
-1208  1209 -1210  16  1212 0
-1208  1209 -1210  16 -1213 0

c  -2-1 --> break 
c    ( b^{1, 16}_2 ∧  b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧ -p_16) -> break
c  in CNF:
c    -b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨  b^{1, 16}_0 ∨  p_16 ∨ break
c  in DIMACS:
-1208 -1209  1210  16 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 16}_2 ∧ -b^{1, 16}_1 ∧ -b^{1, 16}_0 ∧ true) 
c  in CNF:
c    -b^{1, 16}_2 ∨  b^{1, 16}_1 ∨  b^{1, 16}_0 ∨ false 
c  in DIMACS:
-1208  1209  1210  0

c  3 does not represent an automaton state.
c    -(-b^{1, 16}_2 ∧  b^{1, 16}_1 ∧  b^{1, 16}_0 ∧ true) 
c  in CNF:
c     b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ false 
c  in DIMACS:
 1208 -1209 -1210  0
c  -3 does not represent an automaton state.
c    -( b^{1, 16}_2 ∧  b^{1, 16}_1 ∧  b^{1, 16}_0 ∧ true) 
c  in CNF:
c    -b^{1, 16}_2 ∨ -b^{1, 16}_1 ∨ -b^{1, 16}_0 ∨ false 
c  in DIMACS:
-1208 -1209 -1210  0

c i = 17
c  -2+1 --> -1
c    ( b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧  p_17) -> ( b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0)
c  in CNF:
c    -b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨  b^{1, 18}_2
c    -b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_1
c    -b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨  b^{1, 18}_0
c  in DIMACS:
-1211 -1212  1213 -17  1214 0
-1211 -1212  1213 -17 -1215 0
-1211 -1212  1213 -17  1216 0

c  -1+1 --> 0
c    ( b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0 ∧  p_17) -> (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧ -b^{1, 18}_0)
c  in CNF:
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_2
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_1
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_0
c  in DIMACS:
-1211  1212 -1213 -17 -1214 0
-1211  1212 -1213 -17 -1215 0
-1211  1212 -1213 -17 -1216 0

c  0+1 --> 1
c    (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧  p_17) -> (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0)
c  in CNF:
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_2
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_1
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨  b^{1, 18}_0
c  in DIMACS:
 1211  1212  1213 -17 -1214 0
 1211  1212  1213 -17 -1215 0
 1211  1212  1213 -17  1216 0

c  1+1 --> 2
c    (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0 ∧  p_17) -> (-b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0)
c  in CNF:
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_2
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨  b^{1, 18}_1
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ -p_17 ∨ -b^{1, 18}_0
c  in DIMACS:
 1211  1212 -1213 -17 -1214 0
 1211  1212 -1213 -17  1215 0
 1211  1212 -1213 -17 -1216 0

c  2+1 --> break 
c    (-b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧  p_17) -> break
c  in CNF:
c     b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ -p_17 ∨ break
c  in DIMACS:
 1211 -1212  1213 -17 1162 0


c  2-1 --> 1
c    (-b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧ -p_17) -> (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0)
c  in CNF:
c     b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_2
c     b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_1
c     b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨  b^{1, 18}_0
c  in DIMACS:
 1211 -1212  1213  17 -1214 0
 1211 -1212  1213  17 -1215 0
 1211 -1212  1213  17  1216 0

c  1-1 --> 0
c    (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0 ∧ -p_17) -> (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧ -b^{1, 18}_0)
c  in CNF:
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_2
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_1
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_0
c  in DIMACS:
 1211  1212 -1213  17 -1214 0
 1211  1212 -1213  17 -1215 0
 1211  1212 -1213  17 -1216 0

c  0-1 --> -1
c    (-b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧ -p_17) -> ( b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0)
c  in CNF:
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨  b^{1, 18}_2
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_1
c     b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨  b^{1, 18}_0
c  in DIMACS:
 1211  1212  1213  17  1214 0
 1211  1212  1213  17 -1215 0
 1211  1212  1213  17  1216 0

c  -1-1 --> -2
c    ( b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧  b^{1, 17}_0 ∧ -p_17) -> ( b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0)
c  in CNF:
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨  b^{1, 18}_2
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨  b^{1, 18}_1
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨  p_17 ∨ -b^{1, 18}_0
c  in DIMACS:
-1211  1212 -1213  17  1214 0
-1211  1212 -1213  17  1215 0
-1211  1212 -1213  17 -1216 0

c  -2-1 --> break 
c    ( b^{1, 17}_2 ∧  b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧ -p_17) -> break
c  in CNF:
c    -b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨  b^{1, 17}_0 ∨  p_17 ∨ break
c  in DIMACS:
-1211 -1212  1213  17 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 17}_2 ∧ -b^{1, 17}_1 ∧ -b^{1, 17}_0 ∧ true) 
c  in CNF:
c    -b^{1, 17}_2 ∨  b^{1, 17}_1 ∨  b^{1, 17}_0 ∨ false 
c  in DIMACS:
-1211  1212  1213  0

c  3 does not represent an automaton state.
c    -(-b^{1, 17}_2 ∧  b^{1, 17}_1 ∧  b^{1, 17}_0 ∧ true) 
c  in CNF:
c     b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ false 
c  in DIMACS:
 1211 -1212 -1213  0
c  -3 does not represent an automaton state.
c    -( b^{1, 17}_2 ∧  b^{1, 17}_1 ∧  b^{1, 17}_0 ∧ true) 
c  in CNF:
c    -b^{1, 17}_2 ∨ -b^{1, 17}_1 ∨ -b^{1, 17}_0 ∨ false 
c  in DIMACS:
-1211 -1212 -1213  0

c i = 18
c  -2+1 --> -1
c    ( b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧  p_18) -> ( b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0)
c  in CNF:
c    -b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨  b^{1, 19}_2
c    -b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_1
c    -b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨  b^{1, 19}_0
c  in DIMACS:
-1214 -1215  1216 -18  1217 0
-1214 -1215  1216 -18 -1218 0
-1214 -1215  1216 -18  1219 0

c  -1+1 --> 0
c    ( b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0 ∧  p_18) -> (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧ -b^{1, 19}_0)
c  in CNF:
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_2
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_1
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_0
c  in DIMACS:
-1214  1215 -1216 -18 -1217 0
-1214  1215 -1216 -18 -1218 0
-1214  1215 -1216 -18 -1219 0

c  0+1 --> 1
c    (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧  p_18) -> (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0)
c  in CNF:
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_2
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_1
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨  b^{1, 19}_0
c  in DIMACS:
 1214  1215  1216 -18 -1217 0
 1214  1215  1216 -18 -1218 0
 1214  1215  1216 -18  1219 0

c  1+1 --> 2
c    (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0 ∧  p_18) -> (-b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0)
c  in CNF:
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_2
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨  b^{1, 19}_1
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ -p_18 ∨ -b^{1, 19}_0
c  in DIMACS:
 1214  1215 -1216 -18 -1217 0
 1214  1215 -1216 -18  1218 0
 1214  1215 -1216 -18 -1219 0

c  2+1 --> break 
c    (-b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧  p_18) -> break
c  in CNF:
c     b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 1214 -1215  1216 -18 1162 0


c  2-1 --> 1
c    (-b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧ -p_18) -> (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0)
c  in CNF:
c     b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_2
c     b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_1
c     b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨  b^{1, 19}_0
c  in DIMACS:
 1214 -1215  1216  18 -1217 0
 1214 -1215  1216  18 -1218 0
 1214 -1215  1216  18  1219 0

c  1-1 --> 0
c    (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0 ∧ -p_18) -> (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧ -b^{1, 19}_0)
c  in CNF:
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_2
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_1
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_0
c  in DIMACS:
 1214  1215 -1216  18 -1217 0
 1214  1215 -1216  18 -1218 0
 1214  1215 -1216  18 -1219 0

c  0-1 --> -1
c    (-b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧ -p_18) -> ( b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0)
c  in CNF:
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨  b^{1, 19}_2
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_1
c     b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨  b^{1, 19}_0
c  in DIMACS:
 1214  1215  1216  18  1217 0
 1214  1215  1216  18 -1218 0
 1214  1215  1216  18  1219 0

c  -1-1 --> -2
c    ( b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧  b^{1, 18}_0 ∧ -p_18) -> ( b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0)
c  in CNF:
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨  b^{1, 19}_2
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨  b^{1, 19}_1
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨  p_18 ∨ -b^{1, 19}_0
c  in DIMACS:
-1214  1215 -1216  18  1217 0
-1214  1215 -1216  18  1218 0
-1214  1215 -1216  18 -1219 0

c  -2-1 --> break 
c    ( b^{1, 18}_2 ∧  b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨  b^{1, 18}_0 ∨  p_18 ∨ break
c  in DIMACS:
-1214 -1215  1216  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 18}_2 ∧ -b^{1, 18}_1 ∧ -b^{1, 18}_0 ∧ true) 
c  in CNF:
c    -b^{1, 18}_2 ∨  b^{1, 18}_1 ∨  b^{1, 18}_0 ∨ false 
c  in DIMACS:
-1214  1215  1216  0

c  3 does not represent an automaton state.
c    -(-b^{1, 18}_2 ∧  b^{1, 18}_1 ∧  b^{1, 18}_0 ∧ true) 
c  in CNF:
c     b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ false 
c  in DIMACS:
 1214 -1215 -1216  0
c  -3 does not represent an automaton state.
c    -( b^{1, 18}_2 ∧  b^{1, 18}_1 ∧  b^{1, 18}_0 ∧ true) 
c  in CNF:
c    -b^{1, 18}_2 ∨ -b^{1, 18}_1 ∨ -b^{1, 18}_0 ∨ false 
c  in DIMACS:
-1214 -1215 -1216  0

c i = 19
c  -2+1 --> -1
c    ( b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧  p_19) -> ( b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0)
c  in CNF:
c    -b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨  b^{1, 20}_2
c    -b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_1
c    -b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨  b^{1, 20}_0
c  in DIMACS:
-1217 -1218  1219 -19  1220 0
-1217 -1218  1219 -19 -1221 0
-1217 -1218  1219 -19  1222 0

c  -1+1 --> 0
c    ( b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0 ∧  p_19) -> (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧ -b^{1, 20}_0)
c  in CNF:
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_2
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_1
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_0
c  in DIMACS:
-1217  1218 -1219 -19 -1220 0
-1217  1218 -1219 -19 -1221 0
-1217  1218 -1219 -19 -1222 0

c  0+1 --> 1
c    (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧  p_19) -> (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0)
c  in CNF:
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_2
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_1
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨  b^{1, 20}_0
c  in DIMACS:
 1217  1218  1219 -19 -1220 0
 1217  1218  1219 -19 -1221 0
 1217  1218  1219 -19  1222 0

c  1+1 --> 2
c    (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0 ∧  p_19) -> (-b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0)
c  in CNF:
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_2
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨  b^{1, 20}_1
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ -p_19 ∨ -b^{1, 20}_0
c  in DIMACS:
 1217  1218 -1219 -19 -1220 0
 1217  1218 -1219 -19  1221 0
 1217  1218 -1219 -19 -1222 0

c  2+1 --> break 
c    (-b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧  p_19) -> break
c  in CNF:
c     b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ -p_19 ∨ break
c  in DIMACS:
 1217 -1218  1219 -19 1162 0


c  2-1 --> 1
c    (-b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧ -p_19) -> (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0)
c  in CNF:
c     b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_2
c     b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_1
c     b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨  b^{1, 20}_0
c  in DIMACS:
 1217 -1218  1219  19 -1220 0
 1217 -1218  1219  19 -1221 0
 1217 -1218  1219  19  1222 0

c  1-1 --> 0
c    (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0 ∧ -p_19) -> (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧ -b^{1, 20}_0)
c  in CNF:
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_2
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_1
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_0
c  in DIMACS:
 1217  1218 -1219  19 -1220 0
 1217  1218 -1219  19 -1221 0
 1217  1218 -1219  19 -1222 0

c  0-1 --> -1
c    (-b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧ -p_19) -> ( b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0)
c  in CNF:
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨  b^{1, 20}_2
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_1
c     b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨  b^{1, 20}_0
c  in DIMACS:
 1217  1218  1219  19  1220 0
 1217  1218  1219  19 -1221 0
 1217  1218  1219  19  1222 0

c  -1-1 --> -2
c    ( b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧  b^{1, 19}_0 ∧ -p_19) -> ( b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0)
c  in CNF:
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨  b^{1, 20}_2
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨  b^{1, 20}_1
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨  p_19 ∨ -b^{1, 20}_0
c  in DIMACS:
-1217  1218 -1219  19  1220 0
-1217  1218 -1219  19  1221 0
-1217  1218 -1219  19 -1222 0

c  -2-1 --> break 
c    ( b^{1, 19}_2 ∧  b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧ -p_19) -> break
c  in CNF:
c    -b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨  b^{1, 19}_0 ∨  p_19 ∨ break
c  in DIMACS:
-1217 -1218  1219  19 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 19}_2 ∧ -b^{1, 19}_1 ∧ -b^{1, 19}_0 ∧ true) 
c  in CNF:
c    -b^{1, 19}_2 ∨  b^{1, 19}_1 ∨  b^{1, 19}_0 ∨ false 
c  in DIMACS:
-1217  1218  1219  0

c  3 does not represent an automaton state.
c    -(-b^{1, 19}_2 ∧  b^{1, 19}_1 ∧  b^{1, 19}_0 ∧ true) 
c  in CNF:
c     b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ false 
c  in DIMACS:
 1217 -1218 -1219  0
c  -3 does not represent an automaton state.
c    -( b^{1, 19}_2 ∧  b^{1, 19}_1 ∧  b^{1, 19}_0 ∧ true) 
c  in CNF:
c    -b^{1, 19}_2 ∨ -b^{1, 19}_1 ∨ -b^{1, 19}_0 ∨ false 
c  in DIMACS:
-1217 -1218 -1219  0

c i = 20
c  -2+1 --> -1
c    ( b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧  p_20) -> ( b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0)
c  in CNF:
c    -b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨  b^{1, 21}_2
c    -b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_1
c    -b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨  b^{1, 21}_0
c  in DIMACS:
-1220 -1221  1222 -20  1223 0
-1220 -1221  1222 -20 -1224 0
-1220 -1221  1222 -20  1225 0

c  -1+1 --> 0
c    ( b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0 ∧  p_20) -> (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧ -b^{1, 21}_0)
c  in CNF:
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_2
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_1
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_0
c  in DIMACS:
-1220  1221 -1222 -20 -1223 0
-1220  1221 -1222 -20 -1224 0
-1220  1221 -1222 -20 -1225 0

c  0+1 --> 1
c    (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧  p_20) -> (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0)
c  in CNF:
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_2
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_1
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨  b^{1, 21}_0
c  in DIMACS:
 1220  1221  1222 -20 -1223 0
 1220  1221  1222 -20 -1224 0
 1220  1221  1222 -20  1225 0

c  1+1 --> 2
c    (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0 ∧  p_20) -> (-b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0)
c  in CNF:
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_2
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨  b^{1, 21}_1
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ -p_20 ∨ -b^{1, 21}_0
c  in DIMACS:
 1220  1221 -1222 -20 -1223 0
 1220  1221 -1222 -20  1224 0
 1220  1221 -1222 -20 -1225 0

c  2+1 --> break 
c    (-b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧  p_20) -> break
c  in CNF:
c     b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 1220 -1221  1222 -20 1162 0


c  2-1 --> 1
c    (-b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧ -p_20) -> (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0)
c  in CNF:
c     b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_2
c     b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_1
c     b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨  b^{1, 21}_0
c  in DIMACS:
 1220 -1221  1222  20 -1223 0
 1220 -1221  1222  20 -1224 0
 1220 -1221  1222  20  1225 0

c  1-1 --> 0
c    (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0 ∧ -p_20) -> (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧ -b^{1, 21}_0)
c  in CNF:
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_2
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_1
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_0
c  in DIMACS:
 1220  1221 -1222  20 -1223 0
 1220  1221 -1222  20 -1224 0
 1220  1221 -1222  20 -1225 0

c  0-1 --> -1
c    (-b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧ -p_20) -> ( b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0)
c  in CNF:
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨  b^{1, 21}_2
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_1
c     b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨  b^{1, 21}_0
c  in DIMACS:
 1220  1221  1222  20  1223 0
 1220  1221  1222  20 -1224 0
 1220  1221  1222  20  1225 0

c  -1-1 --> -2
c    ( b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧  b^{1, 20}_0 ∧ -p_20) -> ( b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0)
c  in CNF:
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨  b^{1, 21}_2
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨  b^{1, 21}_1
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨  p_20 ∨ -b^{1, 21}_0
c  in DIMACS:
-1220  1221 -1222  20  1223 0
-1220  1221 -1222  20  1224 0
-1220  1221 -1222  20 -1225 0

c  -2-1 --> break 
c    ( b^{1, 20}_2 ∧  b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨  b^{1, 20}_0 ∨  p_20 ∨ break
c  in DIMACS:
-1220 -1221  1222  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 20}_2 ∧ -b^{1, 20}_1 ∧ -b^{1, 20}_0 ∧ true) 
c  in CNF:
c    -b^{1, 20}_2 ∨  b^{1, 20}_1 ∨  b^{1, 20}_0 ∨ false 
c  in DIMACS:
-1220  1221  1222  0

c  3 does not represent an automaton state.
c    -(-b^{1, 20}_2 ∧  b^{1, 20}_1 ∧  b^{1, 20}_0 ∧ true) 
c  in CNF:
c     b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ false 
c  in DIMACS:
 1220 -1221 -1222  0
c  -3 does not represent an automaton state.
c    -( b^{1, 20}_2 ∧  b^{1, 20}_1 ∧  b^{1, 20}_0 ∧ true) 
c  in CNF:
c    -b^{1, 20}_2 ∨ -b^{1, 20}_1 ∨ -b^{1, 20}_0 ∨ false 
c  in DIMACS:
-1220 -1221 -1222  0

c i = 21
c  -2+1 --> -1
c    ( b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧  p_21) -> ( b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0)
c  in CNF:
c    -b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨  b^{1, 22}_2
c    -b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_1
c    -b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨  b^{1, 22}_0
c  in DIMACS:
-1223 -1224  1225 -21  1226 0
-1223 -1224  1225 -21 -1227 0
-1223 -1224  1225 -21  1228 0

c  -1+1 --> 0
c    ( b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0 ∧  p_21) -> (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧ -b^{1, 22}_0)
c  in CNF:
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_2
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_1
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_0
c  in DIMACS:
-1223  1224 -1225 -21 -1226 0
-1223  1224 -1225 -21 -1227 0
-1223  1224 -1225 -21 -1228 0

c  0+1 --> 1
c    (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧  p_21) -> (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0)
c  in CNF:
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_2
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_1
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨  b^{1, 22}_0
c  in DIMACS:
 1223  1224  1225 -21 -1226 0
 1223  1224  1225 -21 -1227 0
 1223  1224  1225 -21  1228 0

c  1+1 --> 2
c    (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0 ∧  p_21) -> (-b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0)
c  in CNF:
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_2
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨  b^{1, 22}_1
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ -p_21 ∨ -b^{1, 22}_0
c  in DIMACS:
 1223  1224 -1225 -21 -1226 0
 1223  1224 -1225 -21  1227 0
 1223  1224 -1225 -21 -1228 0

c  2+1 --> break 
c    (-b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧  p_21) -> break
c  in CNF:
c     b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ -p_21 ∨ break
c  in DIMACS:
 1223 -1224  1225 -21 1162 0


c  2-1 --> 1
c    (-b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧ -p_21) -> (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0)
c  in CNF:
c     b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_2
c     b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_1
c     b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨  b^{1, 22}_0
c  in DIMACS:
 1223 -1224  1225  21 -1226 0
 1223 -1224  1225  21 -1227 0
 1223 -1224  1225  21  1228 0

c  1-1 --> 0
c    (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0 ∧ -p_21) -> (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧ -b^{1, 22}_0)
c  in CNF:
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_2
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_1
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_0
c  in DIMACS:
 1223  1224 -1225  21 -1226 0
 1223  1224 -1225  21 -1227 0
 1223  1224 -1225  21 -1228 0

c  0-1 --> -1
c    (-b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧ -p_21) -> ( b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0)
c  in CNF:
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨  b^{1, 22}_2
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_1
c     b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨  b^{1, 22}_0
c  in DIMACS:
 1223  1224  1225  21  1226 0
 1223  1224  1225  21 -1227 0
 1223  1224  1225  21  1228 0

c  -1-1 --> -2
c    ( b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧  b^{1, 21}_0 ∧ -p_21) -> ( b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0)
c  in CNF:
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨  b^{1, 22}_2
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨  b^{1, 22}_1
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨  p_21 ∨ -b^{1, 22}_0
c  in DIMACS:
-1223  1224 -1225  21  1226 0
-1223  1224 -1225  21  1227 0
-1223  1224 -1225  21 -1228 0

c  -2-1 --> break 
c    ( b^{1, 21}_2 ∧  b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧ -p_21) -> break
c  in CNF:
c    -b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨  b^{1, 21}_0 ∨  p_21 ∨ break
c  in DIMACS:
-1223 -1224  1225  21 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 21}_2 ∧ -b^{1, 21}_1 ∧ -b^{1, 21}_0 ∧ true) 
c  in CNF:
c    -b^{1, 21}_2 ∨  b^{1, 21}_1 ∨  b^{1, 21}_0 ∨ false 
c  in DIMACS:
-1223  1224  1225  0

c  3 does not represent an automaton state.
c    -(-b^{1, 21}_2 ∧  b^{1, 21}_1 ∧  b^{1, 21}_0 ∧ true) 
c  in CNF:
c     b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ false 
c  in DIMACS:
 1223 -1224 -1225  0
c  -3 does not represent an automaton state.
c    -( b^{1, 21}_2 ∧  b^{1, 21}_1 ∧  b^{1, 21}_0 ∧ true) 
c  in CNF:
c    -b^{1, 21}_2 ∨ -b^{1, 21}_1 ∨ -b^{1, 21}_0 ∨ false 
c  in DIMACS:
-1223 -1224 -1225  0

c i = 22
c  -2+1 --> -1
c    ( b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧  p_22) -> ( b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0)
c  in CNF:
c    -b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨  b^{1, 23}_2
c    -b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_1
c    -b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨  b^{1, 23}_0
c  in DIMACS:
-1226 -1227  1228 -22  1229 0
-1226 -1227  1228 -22 -1230 0
-1226 -1227  1228 -22  1231 0

c  -1+1 --> 0
c    ( b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0 ∧  p_22) -> (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧ -b^{1, 23}_0)
c  in CNF:
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_2
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_1
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_0
c  in DIMACS:
-1226  1227 -1228 -22 -1229 0
-1226  1227 -1228 -22 -1230 0
-1226  1227 -1228 -22 -1231 0

c  0+1 --> 1
c    (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧  p_22) -> (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0)
c  in CNF:
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_2
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_1
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨  b^{1, 23}_0
c  in DIMACS:
 1226  1227  1228 -22 -1229 0
 1226  1227  1228 -22 -1230 0
 1226  1227  1228 -22  1231 0

c  1+1 --> 2
c    (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0 ∧  p_22) -> (-b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0)
c  in CNF:
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_2
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨  b^{1, 23}_1
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ -p_22 ∨ -b^{1, 23}_0
c  in DIMACS:
 1226  1227 -1228 -22 -1229 0
 1226  1227 -1228 -22  1230 0
 1226  1227 -1228 -22 -1231 0

c  2+1 --> break 
c    (-b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧  p_22) -> break
c  in CNF:
c     b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ -p_22 ∨ break
c  in DIMACS:
 1226 -1227  1228 -22 1162 0


c  2-1 --> 1
c    (-b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧ -p_22) -> (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0)
c  in CNF:
c     b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_2
c     b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_1
c     b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨  b^{1, 23}_0
c  in DIMACS:
 1226 -1227  1228  22 -1229 0
 1226 -1227  1228  22 -1230 0
 1226 -1227  1228  22  1231 0

c  1-1 --> 0
c    (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0 ∧ -p_22) -> (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧ -b^{1, 23}_0)
c  in CNF:
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_2
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_1
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_0
c  in DIMACS:
 1226  1227 -1228  22 -1229 0
 1226  1227 -1228  22 -1230 0
 1226  1227 -1228  22 -1231 0

c  0-1 --> -1
c    (-b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧ -p_22) -> ( b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0)
c  in CNF:
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨  b^{1, 23}_2
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_1
c     b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨  b^{1, 23}_0
c  in DIMACS:
 1226  1227  1228  22  1229 0
 1226  1227  1228  22 -1230 0
 1226  1227  1228  22  1231 0

c  -1-1 --> -2
c    ( b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧  b^{1, 22}_0 ∧ -p_22) -> ( b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0)
c  in CNF:
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨  b^{1, 23}_2
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨  b^{1, 23}_1
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨  p_22 ∨ -b^{1, 23}_0
c  in DIMACS:
-1226  1227 -1228  22  1229 0
-1226  1227 -1228  22  1230 0
-1226  1227 -1228  22 -1231 0

c  -2-1 --> break 
c    ( b^{1, 22}_2 ∧  b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧ -p_22) -> break
c  in CNF:
c    -b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨  b^{1, 22}_0 ∨  p_22 ∨ break
c  in DIMACS:
-1226 -1227  1228  22 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 22}_2 ∧ -b^{1, 22}_1 ∧ -b^{1, 22}_0 ∧ true) 
c  in CNF:
c    -b^{1, 22}_2 ∨  b^{1, 22}_1 ∨  b^{1, 22}_0 ∨ false 
c  in DIMACS:
-1226  1227  1228  0

c  3 does not represent an automaton state.
c    -(-b^{1, 22}_2 ∧  b^{1, 22}_1 ∧  b^{1, 22}_0 ∧ true) 
c  in CNF:
c     b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ false 
c  in DIMACS:
 1226 -1227 -1228  0
c  -3 does not represent an automaton state.
c    -( b^{1, 22}_2 ∧  b^{1, 22}_1 ∧  b^{1, 22}_0 ∧ true) 
c  in CNF:
c    -b^{1, 22}_2 ∨ -b^{1, 22}_1 ∨ -b^{1, 22}_0 ∨ false 
c  in DIMACS:
-1226 -1227 -1228  0

c i = 23
c  -2+1 --> -1
c    ( b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧  p_23) -> ( b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0)
c  in CNF:
c    -b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨  b^{1, 24}_2
c    -b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_1
c    -b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨  b^{1, 24}_0
c  in DIMACS:
-1229 -1230  1231 -23  1232 0
-1229 -1230  1231 -23 -1233 0
-1229 -1230  1231 -23  1234 0

c  -1+1 --> 0
c    ( b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0 ∧  p_23) -> (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧ -b^{1, 24}_0)
c  in CNF:
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_2
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_1
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_0
c  in DIMACS:
-1229  1230 -1231 -23 -1232 0
-1229  1230 -1231 -23 -1233 0
-1229  1230 -1231 -23 -1234 0

c  0+1 --> 1
c    (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧  p_23) -> (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0)
c  in CNF:
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_2
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_1
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨  b^{1, 24}_0
c  in DIMACS:
 1229  1230  1231 -23 -1232 0
 1229  1230  1231 -23 -1233 0
 1229  1230  1231 -23  1234 0

c  1+1 --> 2
c    (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0 ∧  p_23) -> (-b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0)
c  in CNF:
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_2
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨  b^{1, 24}_1
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ -p_23 ∨ -b^{1, 24}_0
c  in DIMACS:
 1229  1230 -1231 -23 -1232 0
 1229  1230 -1231 -23  1233 0
 1229  1230 -1231 -23 -1234 0

c  2+1 --> break 
c    (-b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧  p_23) -> break
c  in CNF:
c     b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ -p_23 ∨ break
c  in DIMACS:
 1229 -1230  1231 -23 1162 0


c  2-1 --> 1
c    (-b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧ -p_23) -> (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0)
c  in CNF:
c     b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_2
c     b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_1
c     b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨  b^{1, 24}_0
c  in DIMACS:
 1229 -1230  1231  23 -1232 0
 1229 -1230  1231  23 -1233 0
 1229 -1230  1231  23  1234 0

c  1-1 --> 0
c    (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0 ∧ -p_23) -> (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧ -b^{1, 24}_0)
c  in CNF:
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_2
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_1
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_0
c  in DIMACS:
 1229  1230 -1231  23 -1232 0
 1229  1230 -1231  23 -1233 0
 1229  1230 -1231  23 -1234 0

c  0-1 --> -1
c    (-b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧ -p_23) -> ( b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0)
c  in CNF:
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨  b^{1, 24}_2
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_1
c     b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨  b^{1, 24}_0
c  in DIMACS:
 1229  1230  1231  23  1232 0
 1229  1230  1231  23 -1233 0
 1229  1230  1231  23  1234 0

c  -1-1 --> -2
c    ( b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧  b^{1, 23}_0 ∧ -p_23) -> ( b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0)
c  in CNF:
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨  b^{1, 24}_2
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨  b^{1, 24}_1
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨  p_23 ∨ -b^{1, 24}_0
c  in DIMACS:
-1229  1230 -1231  23  1232 0
-1229  1230 -1231  23  1233 0
-1229  1230 -1231  23 -1234 0

c  -2-1 --> break 
c    ( b^{1, 23}_2 ∧  b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧ -p_23) -> break
c  in CNF:
c    -b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨  b^{1, 23}_0 ∨  p_23 ∨ break
c  in DIMACS:
-1229 -1230  1231  23 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 23}_2 ∧ -b^{1, 23}_1 ∧ -b^{1, 23}_0 ∧ true) 
c  in CNF:
c    -b^{1, 23}_2 ∨  b^{1, 23}_1 ∨  b^{1, 23}_0 ∨ false 
c  in DIMACS:
-1229  1230  1231  0

c  3 does not represent an automaton state.
c    -(-b^{1, 23}_2 ∧  b^{1, 23}_1 ∧  b^{1, 23}_0 ∧ true) 
c  in CNF:
c     b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ false 
c  in DIMACS:
 1229 -1230 -1231  0
c  -3 does not represent an automaton state.
c    -( b^{1, 23}_2 ∧  b^{1, 23}_1 ∧  b^{1, 23}_0 ∧ true) 
c  in CNF:
c    -b^{1, 23}_2 ∨ -b^{1, 23}_1 ∨ -b^{1, 23}_0 ∨ false 
c  in DIMACS:
-1229 -1230 -1231  0

c i = 24
c  -2+1 --> -1
c    ( b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧  p_24) -> ( b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0)
c  in CNF:
c    -b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨  b^{1, 25}_2
c    -b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_1
c    -b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨  b^{1, 25}_0
c  in DIMACS:
-1232 -1233  1234 -24  1235 0
-1232 -1233  1234 -24 -1236 0
-1232 -1233  1234 -24  1237 0

c  -1+1 --> 0
c    ( b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0 ∧  p_24) -> (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧ -b^{1, 25}_0)
c  in CNF:
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_2
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_1
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_0
c  in DIMACS:
-1232  1233 -1234 -24 -1235 0
-1232  1233 -1234 -24 -1236 0
-1232  1233 -1234 -24 -1237 0

c  0+1 --> 1
c    (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧  p_24) -> (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0)
c  in CNF:
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_2
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_1
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨  b^{1, 25}_0
c  in DIMACS:
 1232  1233  1234 -24 -1235 0
 1232  1233  1234 -24 -1236 0
 1232  1233  1234 -24  1237 0

c  1+1 --> 2
c    (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0 ∧  p_24) -> (-b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0)
c  in CNF:
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_2
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨  b^{1, 25}_1
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ -p_24 ∨ -b^{1, 25}_0
c  in DIMACS:
 1232  1233 -1234 -24 -1235 0
 1232  1233 -1234 -24  1236 0
 1232  1233 -1234 -24 -1237 0

c  2+1 --> break 
c    (-b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧  p_24) -> break
c  in CNF:
c     b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 1232 -1233  1234 -24 1162 0


c  2-1 --> 1
c    (-b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧ -p_24) -> (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0)
c  in CNF:
c     b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_2
c     b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_1
c     b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨  b^{1, 25}_0
c  in DIMACS:
 1232 -1233  1234  24 -1235 0
 1232 -1233  1234  24 -1236 0
 1232 -1233  1234  24  1237 0

c  1-1 --> 0
c    (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0 ∧ -p_24) -> (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧ -b^{1, 25}_0)
c  in CNF:
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_2
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_1
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_0
c  in DIMACS:
 1232  1233 -1234  24 -1235 0
 1232  1233 -1234  24 -1236 0
 1232  1233 -1234  24 -1237 0

c  0-1 --> -1
c    (-b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧ -p_24) -> ( b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0)
c  in CNF:
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨  b^{1, 25}_2
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_1
c     b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨  b^{1, 25}_0
c  in DIMACS:
 1232  1233  1234  24  1235 0
 1232  1233  1234  24 -1236 0
 1232  1233  1234  24  1237 0

c  -1-1 --> -2
c    ( b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧  b^{1, 24}_0 ∧ -p_24) -> ( b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0)
c  in CNF:
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨  b^{1, 25}_2
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨  b^{1, 25}_1
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨  p_24 ∨ -b^{1, 25}_0
c  in DIMACS:
-1232  1233 -1234  24  1235 0
-1232  1233 -1234  24  1236 0
-1232  1233 -1234  24 -1237 0

c  -2-1 --> break 
c    ( b^{1, 24}_2 ∧  b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨  b^{1, 24}_0 ∨  p_24 ∨ break
c  in DIMACS:
-1232 -1233  1234  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 24}_2 ∧ -b^{1, 24}_1 ∧ -b^{1, 24}_0 ∧ true) 
c  in CNF:
c    -b^{1, 24}_2 ∨  b^{1, 24}_1 ∨  b^{1, 24}_0 ∨ false 
c  in DIMACS:
-1232  1233  1234  0

c  3 does not represent an automaton state.
c    -(-b^{1, 24}_2 ∧  b^{1, 24}_1 ∧  b^{1, 24}_0 ∧ true) 
c  in CNF:
c     b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ false 
c  in DIMACS:
 1232 -1233 -1234  0
c  -3 does not represent an automaton state.
c    -( b^{1, 24}_2 ∧  b^{1, 24}_1 ∧  b^{1, 24}_0 ∧ true) 
c  in CNF:
c    -b^{1, 24}_2 ∨ -b^{1, 24}_1 ∨ -b^{1, 24}_0 ∨ false 
c  in DIMACS:
-1232 -1233 -1234  0

c i = 25
c  -2+1 --> -1
c    ( b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧  p_25) -> ( b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0)
c  in CNF:
c    -b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨  b^{1, 26}_2
c    -b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_1
c    -b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨  b^{1, 26}_0
c  in DIMACS:
-1235 -1236  1237 -25  1238 0
-1235 -1236  1237 -25 -1239 0
-1235 -1236  1237 -25  1240 0

c  -1+1 --> 0
c    ( b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0 ∧  p_25) -> (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧ -b^{1, 26}_0)
c  in CNF:
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_2
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_1
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_0
c  in DIMACS:
-1235  1236 -1237 -25 -1238 0
-1235  1236 -1237 -25 -1239 0
-1235  1236 -1237 -25 -1240 0

c  0+1 --> 1
c    (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧  p_25) -> (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0)
c  in CNF:
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_2
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_1
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨  b^{1, 26}_0
c  in DIMACS:
 1235  1236  1237 -25 -1238 0
 1235  1236  1237 -25 -1239 0
 1235  1236  1237 -25  1240 0

c  1+1 --> 2
c    (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0 ∧  p_25) -> (-b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0)
c  in CNF:
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_2
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨  b^{1, 26}_1
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ -p_25 ∨ -b^{1, 26}_0
c  in DIMACS:
 1235  1236 -1237 -25 -1238 0
 1235  1236 -1237 -25  1239 0
 1235  1236 -1237 -25 -1240 0

c  2+1 --> break 
c    (-b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧  p_25) -> break
c  in CNF:
c     b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ -p_25 ∨ break
c  in DIMACS:
 1235 -1236  1237 -25 1162 0


c  2-1 --> 1
c    (-b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧ -p_25) -> (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0)
c  in CNF:
c     b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_2
c     b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_1
c     b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨  b^{1, 26}_0
c  in DIMACS:
 1235 -1236  1237  25 -1238 0
 1235 -1236  1237  25 -1239 0
 1235 -1236  1237  25  1240 0

c  1-1 --> 0
c    (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0 ∧ -p_25) -> (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧ -b^{1, 26}_0)
c  in CNF:
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_2
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_1
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_0
c  in DIMACS:
 1235  1236 -1237  25 -1238 0
 1235  1236 -1237  25 -1239 0
 1235  1236 -1237  25 -1240 0

c  0-1 --> -1
c    (-b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧ -p_25) -> ( b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0)
c  in CNF:
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨  b^{1, 26}_2
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_1
c     b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨  b^{1, 26}_0
c  in DIMACS:
 1235  1236  1237  25  1238 0
 1235  1236  1237  25 -1239 0
 1235  1236  1237  25  1240 0

c  -1-1 --> -2
c    ( b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧  b^{1, 25}_0 ∧ -p_25) -> ( b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0)
c  in CNF:
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨  b^{1, 26}_2
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨  b^{1, 26}_1
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨  p_25 ∨ -b^{1, 26}_0
c  in DIMACS:
-1235  1236 -1237  25  1238 0
-1235  1236 -1237  25  1239 0
-1235  1236 -1237  25 -1240 0

c  -2-1 --> break 
c    ( b^{1, 25}_2 ∧  b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧ -p_25) -> break
c  in CNF:
c    -b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨  b^{1, 25}_0 ∨  p_25 ∨ break
c  in DIMACS:
-1235 -1236  1237  25 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 25}_2 ∧ -b^{1, 25}_1 ∧ -b^{1, 25}_0 ∧ true) 
c  in CNF:
c    -b^{1, 25}_2 ∨  b^{1, 25}_1 ∨  b^{1, 25}_0 ∨ false 
c  in DIMACS:
-1235  1236  1237  0

c  3 does not represent an automaton state.
c    -(-b^{1, 25}_2 ∧  b^{1, 25}_1 ∧  b^{1, 25}_0 ∧ true) 
c  in CNF:
c     b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ false 
c  in DIMACS:
 1235 -1236 -1237  0
c  -3 does not represent an automaton state.
c    -( b^{1, 25}_2 ∧  b^{1, 25}_1 ∧  b^{1, 25}_0 ∧ true) 
c  in CNF:
c    -b^{1, 25}_2 ∨ -b^{1, 25}_1 ∨ -b^{1, 25}_0 ∨ false 
c  in DIMACS:
-1235 -1236 -1237  0

c i = 26
c  -2+1 --> -1
c    ( b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧  p_26) -> ( b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0)
c  in CNF:
c    -b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨  b^{1, 27}_2
c    -b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_1
c    -b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨  b^{1, 27}_0
c  in DIMACS:
-1238 -1239  1240 -26  1241 0
-1238 -1239  1240 -26 -1242 0
-1238 -1239  1240 -26  1243 0

c  -1+1 --> 0
c    ( b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0 ∧  p_26) -> (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧ -b^{1, 27}_0)
c  in CNF:
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_2
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_1
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_0
c  in DIMACS:
-1238  1239 -1240 -26 -1241 0
-1238  1239 -1240 -26 -1242 0
-1238  1239 -1240 -26 -1243 0

c  0+1 --> 1
c    (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧  p_26) -> (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0)
c  in CNF:
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_2
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_1
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨  b^{1, 27}_0
c  in DIMACS:
 1238  1239  1240 -26 -1241 0
 1238  1239  1240 -26 -1242 0
 1238  1239  1240 -26  1243 0

c  1+1 --> 2
c    (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0 ∧  p_26) -> (-b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0)
c  in CNF:
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_2
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨  b^{1, 27}_1
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ -p_26 ∨ -b^{1, 27}_0
c  in DIMACS:
 1238  1239 -1240 -26 -1241 0
 1238  1239 -1240 -26  1242 0
 1238  1239 -1240 -26 -1243 0

c  2+1 --> break 
c    (-b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧  p_26) -> break
c  in CNF:
c     b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ -p_26 ∨ break
c  in DIMACS:
 1238 -1239  1240 -26 1162 0


c  2-1 --> 1
c    (-b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧ -p_26) -> (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0)
c  in CNF:
c     b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_2
c     b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_1
c     b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨  b^{1, 27}_0
c  in DIMACS:
 1238 -1239  1240  26 -1241 0
 1238 -1239  1240  26 -1242 0
 1238 -1239  1240  26  1243 0

c  1-1 --> 0
c    (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0 ∧ -p_26) -> (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧ -b^{1, 27}_0)
c  in CNF:
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_2
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_1
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_0
c  in DIMACS:
 1238  1239 -1240  26 -1241 0
 1238  1239 -1240  26 -1242 0
 1238  1239 -1240  26 -1243 0

c  0-1 --> -1
c    (-b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧ -p_26) -> ( b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0)
c  in CNF:
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨  b^{1, 27}_2
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_1
c     b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨  b^{1, 27}_0
c  in DIMACS:
 1238  1239  1240  26  1241 0
 1238  1239  1240  26 -1242 0
 1238  1239  1240  26  1243 0

c  -1-1 --> -2
c    ( b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧  b^{1, 26}_0 ∧ -p_26) -> ( b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0)
c  in CNF:
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨  b^{1, 27}_2
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨  b^{1, 27}_1
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨  p_26 ∨ -b^{1, 27}_0
c  in DIMACS:
-1238  1239 -1240  26  1241 0
-1238  1239 -1240  26  1242 0
-1238  1239 -1240  26 -1243 0

c  -2-1 --> break 
c    ( b^{1, 26}_2 ∧  b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧ -p_26) -> break
c  in CNF:
c    -b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨  b^{1, 26}_0 ∨  p_26 ∨ break
c  in DIMACS:
-1238 -1239  1240  26 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 26}_2 ∧ -b^{1, 26}_1 ∧ -b^{1, 26}_0 ∧ true) 
c  in CNF:
c    -b^{1, 26}_2 ∨  b^{1, 26}_1 ∨  b^{1, 26}_0 ∨ false 
c  in DIMACS:
-1238  1239  1240  0

c  3 does not represent an automaton state.
c    -(-b^{1, 26}_2 ∧  b^{1, 26}_1 ∧  b^{1, 26}_0 ∧ true) 
c  in CNF:
c     b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ false 
c  in DIMACS:
 1238 -1239 -1240  0
c  -3 does not represent an automaton state.
c    -( b^{1, 26}_2 ∧  b^{1, 26}_1 ∧  b^{1, 26}_0 ∧ true) 
c  in CNF:
c    -b^{1, 26}_2 ∨ -b^{1, 26}_1 ∨ -b^{1, 26}_0 ∨ false 
c  in DIMACS:
-1238 -1239 -1240  0

c i = 27
c  -2+1 --> -1
c    ( b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧  p_27) -> ( b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0)
c  in CNF:
c    -b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨  b^{1, 28}_2
c    -b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_1
c    -b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨  b^{1, 28}_0
c  in DIMACS:
-1241 -1242  1243 -27  1244 0
-1241 -1242  1243 -27 -1245 0
-1241 -1242  1243 -27  1246 0

c  -1+1 --> 0
c    ( b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0 ∧  p_27) -> (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧ -b^{1, 28}_0)
c  in CNF:
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_2
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_1
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_0
c  in DIMACS:
-1241  1242 -1243 -27 -1244 0
-1241  1242 -1243 -27 -1245 0
-1241  1242 -1243 -27 -1246 0

c  0+1 --> 1
c    (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧  p_27) -> (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0)
c  in CNF:
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_2
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_1
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨  b^{1, 28}_0
c  in DIMACS:
 1241  1242  1243 -27 -1244 0
 1241  1242  1243 -27 -1245 0
 1241  1242  1243 -27  1246 0

c  1+1 --> 2
c    (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0 ∧  p_27) -> (-b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0)
c  in CNF:
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_2
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨  b^{1, 28}_1
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ -p_27 ∨ -b^{1, 28}_0
c  in DIMACS:
 1241  1242 -1243 -27 -1244 0
 1241  1242 -1243 -27  1245 0
 1241  1242 -1243 -27 -1246 0

c  2+1 --> break 
c    (-b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧  p_27) -> break
c  in CNF:
c     b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ -p_27 ∨ break
c  in DIMACS:
 1241 -1242  1243 -27 1162 0


c  2-1 --> 1
c    (-b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧ -p_27) -> (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0)
c  in CNF:
c     b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_2
c     b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_1
c     b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨  b^{1, 28}_0
c  in DIMACS:
 1241 -1242  1243  27 -1244 0
 1241 -1242  1243  27 -1245 0
 1241 -1242  1243  27  1246 0

c  1-1 --> 0
c    (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0 ∧ -p_27) -> (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧ -b^{1, 28}_0)
c  in CNF:
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_2
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_1
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_0
c  in DIMACS:
 1241  1242 -1243  27 -1244 0
 1241  1242 -1243  27 -1245 0
 1241  1242 -1243  27 -1246 0

c  0-1 --> -1
c    (-b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧ -p_27) -> ( b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0)
c  in CNF:
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨  b^{1, 28}_2
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_1
c     b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨  b^{1, 28}_0
c  in DIMACS:
 1241  1242  1243  27  1244 0
 1241  1242  1243  27 -1245 0
 1241  1242  1243  27  1246 0

c  -1-1 --> -2
c    ( b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧  b^{1, 27}_0 ∧ -p_27) -> ( b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0)
c  in CNF:
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨  b^{1, 28}_2
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨  b^{1, 28}_1
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨  p_27 ∨ -b^{1, 28}_0
c  in DIMACS:
-1241  1242 -1243  27  1244 0
-1241  1242 -1243  27  1245 0
-1241  1242 -1243  27 -1246 0

c  -2-1 --> break 
c    ( b^{1, 27}_2 ∧  b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧ -p_27) -> break
c  in CNF:
c    -b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨  b^{1, 27}_0 ∨  p_27 ∨ break
c  in DIMACS:
-1241 -1242  1243  27 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 27}_2 ∧ -b^{1, 27}_1 ∧ -b^{1, 27}_0 ∧ true) 
c  in CNF:
c    -b^{1, 27}_2 ∨  b^{1, 27}_1 ∨  b^{1, 27}_0 ∨ false 
c  in DIMACS:
-1241  1242  1243  0

c  3 does not represent an automaton state.
c    -(-b^{1, 27}_2 ∧  b^{1, 27}_1 ∧  b^{1, 27}_0 ∧ true) 
c  in CNF:
c     b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ false 
c  in DIMACS:
 1241 -1242 -1243  0
c  -3 does not represent an automaton state.
c    -( b^{1, 27}_2 ∧  b^{1, 27}_1 ∧  b^{1, 27}_0 ∧ true) 
c  in CNF:
c    -b^{1, 27}_2 ∨ -b^{1, 27}_1 ∨ -b^{1, 27}_0 ∨ false 
c  in DIMACS:
-1241 -1242 -1243  0

c i = 28
c  -2+1 --> -1
c    ( b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧  p_28) -> ( b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0)
c  in CNF:
c    -b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨  b^{1, 29}_2
c    -b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_1
c    -b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨  b^{1, 29}_0
c  in DIMACS:
-1244 -1245  1246 -28  1247 0
-1244 -1245  1246 -28 -1248 0
-1244 -1245  1246 -28  1249 0

c  -1+1 --> 0
c    ( b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0 ∧  p_28) -> (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧ -b^{1, 29}_0)
c  in CNF:
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_2
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_1
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_0
c  in DIMACS:
-1244  1245 -1246 -28 -1247 0
-1244  1245 -1246 -28 -1248 0
-1244  1245 -1246 -28 -1249 0

c  0+1 --> 1
c    (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧  p_28) -> (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0)
c  in CNF:
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_2
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_1
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨  b^{1, 29}_0
c  in DIMACS:
 1244  1245  1246 -28 -1247 0
 1244  1245  1246 -28 -1248 0
 1244  1245  1246 -28  1249 0

c  1+1 --> 2
c    (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0 ∧  p_28) -> (-b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0)
c  in CNF:
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_2
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨  b^{1, 29}_1
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ -p_28 ∨ -b^{1, 29}_0
c  in DIMACS:
 1244  1245 -1246 -28 -1247 0
 1244  1245 -1246 -28  1248 0
 1244  1245 -1246 -28 -1249 0

c  2+1 --> break 
c    (-b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧  p_28) -> break
c  in CNF:
c     b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 1244 -1245  1246 -28 1162 0


c  2-1 --> 1
c    (-b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧ -p_28) -> (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0)
c  in CNF:
c     b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_2
c     b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_1
c     b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨  b^{1, 29}_0
c  in DIMACS:
 1244 -1245  1246  28 -1247 0
 1244 -1245  1246  28 -1248 0
 1244 -1245  1246  28  1249 0

c  1-1 --> 0
c    (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0 ∧ -p_28) -> (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧ -b^{1, 29}_0)
c  in CNF:
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_2
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_1
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_0
c  in DIMACS:
 1244  1245 -1246  28 -1247 0
 1244  1245 -1246  28 -1248 0
 1244  1245 -1246  28 -1249 0

c  0-1 --> -1
c    (-b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧ -p_28) -> ( b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0)
c  in CNF:
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨  b^{1, 29}_2
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_1
c     b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨  b^{1, 29}_0
c  in DIMACS:
 1244  1245  1246  28  1247 0
 1244  1245  1246  28 -1248 0
 1244  1245  1246  28  1249 0

c  -1-1 --> -2
c    ( b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧  b^{1, 28}_0 ∧ -p_28) -> ( b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0)
c  in CNF:
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨  b^{1, 29}_2
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨  b^{1, 29}_1
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨  p_28 ∨ -b^{1, 29}_0
c  in DIMACS:
-1244  1245 -1246  28  1247 0
-1244  1245 -1246  28  1248 0
-1244  1245 -1246  28 -1249 0

c  -2-1 --> break 
c    ( b^{1, 28}_2 ∧  b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨  b^{1, 28}_0 ∨  p_28 ∨ break
c  in DIMACS:
-1244 -1245  1246  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 28}_2 ∧ -b^{1, 28}_1 ∧ -b^{1, 28}_0 ∧ true) 
c  in CNF:
c    -b^{1, 28}_2 ∨  b^{1, 28}_1 ∨  b^{1, 28}_0 ∨ false 
c  in DIMACS:
-1244  1245  1246  0

c  3 does not represent an automaton state.
c    -(-b^{1, 28}_2 ∧  b^{1, 28}_1 ∧  b^{1, 28}_0 ∧ true) 
c  in CNF:
c     b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ false 
c  in DIMACS:
 1244 -1245 -1246  0
c  -3 does not represent an automaton state.
c    -( b^{1, 28}_2 ∧  b^{1, 28}_1 ∧  b^{1, 28}_0 ∧ true) 
c  in CNF:
c    -b^{1, 28}_2 ∨ -b^{1, 28}_1 ∨ -b^{1, 28}_0 ∨ false 
c  in DIMACS:
-1244 -1245 -1246  0

c i = 29
c  -2+1 --> -1
c    ( b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧  p_29) -> ( b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0)
c  in CNF:
c    -b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨  b^{1, 30}_2
c    -b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_1
c    -b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨  b^{1, 30}_0
c  in DIMACS:
-1247 -1248  1249 -29  1250 0
-1247 -1248  1249 -29 -1251 0
-1247 -1248  1249 -29  1252 0

c  -1+1 --> 0
c    ( b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0 ∧  p_29) -> (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧ -b^{1, 30}_0)
c  in CNF:
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_2
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_1
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_0
c  in DIMACS:
-1247  1248 -1249 -29 -1250 0
-1247  1248 -1249 -29 -1251 0
-1247  1248 -1249 -29 -1252 0

c  0+1 --> 1
c    (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧  p_29) -> (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0)
c  in CNF:
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_2
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_1
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨  b^{1, 30}_0
c  in DIMACS:
 1247  1248  1249 -29 -1250 0
 1247  1248  1249 -29 -1251 0
 1247  1248  1249 -29  1252 0

c  1+1 --> 2
c    (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0 ∧  p_29) -> (-b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0)
c  in CNF:
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_2
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨  b^{1, 30}_1
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ -p_29 ∨ -b^{1, 30}_0
c  in DIMACS:
 1247  1248 -1249 -29 -1250 0
 1247  1248 -1249 -29  1251 0
 1247  1248 -1249 -29 -1252 0

c  2+1 --> break 
c    (-b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧  p_29) -> break
c  in CNF:
c     b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ -p_29 ∨ break
c  in DIMACS:
 1247 -1248  1249 -29 1162 0


c  2-1 --> 1
c    (-b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧ -p_29) -> (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0)
c  in CNF:
c     b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_2
c     b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_1
c     b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨  b^{1, 30}_0
c  in DIMACS:
 1247 -1248  1249  29 -1250 0
 1247 -1248  1249  29 -1251 0
 1247 -1248  1249  29  1252 0

c  1-1 --> 0
c    (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0 ∧ -p_29) -> (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧ -b^{1, 30}_0)
c  in CNF:
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_2
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_1
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_0
c  in DIMACS:
 1247  1248 -1249  29 -1250 0
 1247  1248 -1249  29 -1251 0
 1247  1248 -1249  29 -1252 0

c  0-1 --> -1
c    (-b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧ -p_29) -> ( b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0)
c  in CNF:
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨  b^{1, 30}_2
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_1
c     b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨  b^{1, 30}_0
c  in DIMACS:
 1247  1248  1249  29  1250 0
 1247  1248  1249  29 -1251 0
 1247  1248  1249  29  1252 0

c  -1-1 --> -2
c    ( b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧  b^{1, 29}_0 ∧ -p_29) -> ( b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0)
c  in CNF:
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨  b^{1, 30}_2
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨  b^{1, 30}_1
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨  p_29 ∨ -b^{1, 30}_0
c  in DIMACS:
-1247  1248 -1249  29  1250 0
-1247  1248 -1249  29  1251 0
-1247  1248 -1249  29 -1252 0

c  -2-1 --> break 
c    ( b^{1, 29}_2 ∧  b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧ -p_29) -> break
c  in CNF:
c    -b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨  b^{1, 29}_0 ∨  p_29 ∨ break
c  in DIMACS:
-1247 -1248  1249  29 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 29}_2 ∧ -b^{1, 29}_1 ∧ -b^{1, 29}_0 ∧ true) 
c  in CNF:
c    -b^{1, 29}_2 ∨  b^{1, 29}_1 ∨  b^{1, 29}_0 ∨ false 
c  in DIMACS:
-1247  1248  1249  0

c  3 does not represent an automaton state.
c    -(-b^{1, 29}_2 ∧  b^{1, 29}_1 ∧  b^{1, 29}_0 ∧ true) 
c  in CNF:
c     b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ false 
c  in DIMACS:
 1247 -1248 -1249  0
c  -3 does not represent an automaton state.
c    -( b^{1, 29}_2 ∧  b^{1, 29}_1 ∧  b^{1, 29}_0 ∧ true) 
c  in CNF:
c    -b^{1, 29}_2 ∨ -b^{1, 29}_1 ∨ -b^{1, 29}_0 ∨ false 
c  in DIMACS:
-1247 -1248 -1249  0

c i = 30
c  -2+1 --> -1
c    ( b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧  p_30) -> ( b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0)
c  in CNF:
c    -b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨  b^{1, 31}_2
c    -b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_1
c    -b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨  b^{1, 31}_0
c  in DIMACS:
-1250 -1251  1252 -30  1253 0
-1250 -1251  1252 -30 -1254 0
-1250 -1251  1252 -30  1255 0

c  -1+1 --> 0
c    ( b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0 ∧  p_30) -> (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧ -b^{1, 31}_0)
c  in CNF:
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_2
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_1
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_0
c  in DIMACS:
-1250  1251 -1252 -30 -1253 0
-1250  1251 -1252 -30 -1254 0
-1250  1251 -1252 -30 -1255 0

c  0+1 --> 1
c    (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧  p_30) -> (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0)
c  in CNF:
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_2
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_1
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨  b^{1, 31}_0
c  in DIMACS:
 1250  1251  1252 -30 -1253 0
 1250  1251  1252 -30 -1254 0
 1250  1251  1252 -30  1255 0

c  1+1 --> 2
c    (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0 ∧  p_30) -> (-b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0)
c  in CNF:
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_2
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨  b^{1, 31}_1
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ -p_30 ∨ -b^{1, 31}_0
c  in DIMACS:
 1250  1251 -1252 -30 -1253 0
 1250  1251 -1252 -30  1254 0
 1250  1251 -1252 -30 -1255 0

c  2+1 --> break 
c    (-b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧  p_30) -> break
c  in CNF:
c     b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 1250 -1251  1252 -30 1162 0


c  2-1 --> 1
c    (-b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧ -p_30) -> (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0)
c  in CNF:
c     b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_2
c     b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_1
c     b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨  b^{1, 31}_0
c  in DIMACS:
 1250 -1251  1252  30 -1253 0
 1250 -1251  1252  30 -1254 0
 1250 -1251  1252  30  1255 0

c  1-1 --> 0
c    (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0 ∧ -p_30) -> (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧ -b^{1, 31}_0)
c  in CNF:
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_2
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_1
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_0
c  in DIMACS:
 1250  1251 -1252  30 -1253 0
 1250  1251 -1252  30 -1254 0
 1250  1251 -1252  30 -1255 0

c  0-1 --> -1
c    (-b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧ -p_30) -> ( b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0)
c  in CNF:
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨  b^{1, 31}_2
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_1
c     b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨  b^{1, 31}_0
c  in DIMACS:
 1250  1251  1252  30  1253 0
 1250  1251  1252  30 -1254 0
 1250  1251  1252  30  1255 0

c  -1-1 --> -2
c    ( b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧  b^{1, 30}_0 ∧ -p_30) -> ( b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0)
c  in CNF:
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨  b^{1, 31}_2
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨  b^{1, 31}_1
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨  p_30 ∨ -b^{1, 31}_0
c  in DIMACS:
-1250  1251 -1252  30  1253 0
-1250  1251 -1252  30  1254 0
-1250  1251 -1252  30 -1255 0

c  -2-1 --> break 
c    ( b^{1, 30}_2 ∧  b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨  b^{1, 30}_0 ∨  p_30 ∨ break
c  in DIMACS:
-1250 -1251  1252  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 30}_2 ∧ -b^{1, 30}_1 ∧ -b^{1, 30}_0 ∧ true) 
c  in CNF:
c    -b^{1, 30}_2 ∨  b^{1, 30}_1 ∨  b^{1, 30}_0 ∨ false 
c  in DIMACS:
-1250  1251  1252  0

c  3 does not represent an automaton state.
c    -(-b^{1, 30}_2 ∧  b^{1, 30}_1 ∧  b^{1, 30}_0 ∧ true) 
c  in CNF:
c     b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ false 
c  in DIMACS:
 1250 -1251 -1252  0
c  -3 does not represent an automaton state.
c    -( b^{1, 30}_2 ∧  b^{1, 30}_1 ∧  b^{1, 30}_0 ∧ true) 
c  in CNF:
c    -b^{1, 30}_2 ∨ -b^{1, 30}_1 ∨ -b^{1, 30}_0 ∨ false 
c  in DIMACS:
-1250 -1251 -1252  0

c i = 31
c  -2+1 --> -1
c    ( b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧  p_31) -> ( b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0)
c  in CNF:
c    -b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨  b^{1, 32}_2
c    -b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_1
c    -b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨  b^{1, 32}_0
c  in DIMACS:
-1253 -1254  1255 -31  1256 0
-1253 -1254  1255 -31 -1257 0
-1253 -1254  1255 -31  1258 0

c  -1+1 --> 0
c    ( b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0 ∧  p_31) -> (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧ -b^{1, 32}_0)
c  in CNF:
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_2
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_1
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_0
c  in DIMACS:
-1253  1254 -1255 -31 -1256 0
-1253  1254 -1255 -31 -1257 0
-1253  1254 -1255 -31 -1258 0

c  0+1 --> 1
c    (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧  p_31) -> (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0)
c  in CNF:
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_2
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_1
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨  b^{1, 32}_0
c  in DIMACS:
 1253  1254  1255 -31 -1256 0
 1253  1254  1255 -31 -1257 0
 1253  1254  1255 -31  1258 0

c  1+1 --> 2
c    (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0 ∧  p_31) -> (-b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0)
c  in CNF:
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_2
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨  b^{1, 32}_1
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ -p_31 ∨ -b^{1, 32}_0
c  in DIMACS:
 1253  1254 -1255 -31 -1256 0
 1253  1254 -1255 -31  1257 0
 1253  1254 -1255 -31 -1258 0

c  2+1 --> break 
c    (-b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧  p_31) -> break
c  in CNF:
c     b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ -p_31 ∨ break
c  in DIMACS:
 1253 -1254  1255 -31 1162 0


c  2-1 --> 1
c    (-b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧ -p_31) -> (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0)
c  in CNF:
c     b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_2
c     b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_1
c     b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨  b^{1, 32}_0
c  in DIMACS:
 1253 -1254  1255  31 -1256 0
 1253 -1254  1255  31 -1257 0
 1253 -1254  1255  31  1258 0

c  1-1 --> 0
c    (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0 ∧ -p_31) -> (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧ -b^{1, 32}_0)
c  in CNF:
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_2
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_1
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_0
c  in DIMACS:
 1253  1254 -1255  31 -1256 0
 1253  1254 -1255  31 -1257 0
 1253  1254 -1255  31 -1258 0

c  0-1 --> -1
c    (-b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧ -p_31) -> ( b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0)
c  in CNF:
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨  b^{1, 32}_2
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_1
c     b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨  b^{1, 32}_0
c  in DIMACS:
 1253  1254  1255  31  1256 0
 1253  1254  1255  31 -1257 0
 1253  1254  1255  31  1258 0

c  -1-1 --> -2
c    ( b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧  b^{1, 31}_0 ∧ -p_31) -> ( b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0)
c  in CNF:
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨  b^{1, 32}_2
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨  b^{1, 32}_1
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨  p_31 ∨ -b^{1, 32}_0
c  in DIMACS:
-1253  1254 -1255  31  1256 0
-1253  1254 -1255  31  1257 0
-1253  1254 -1255  31 -1258 0

c  -2-1 --> break 
c    ( b^{1, 31}_2 ∧  b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧ -p_31) -> break
c  in CNF:
c    -b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨  b^{1, 31}_0 ∨  p_31 ∨ break
c  in DIMACS:
-1253 -1254  1255  31 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 31}_2 ∧ -b^{1, 31}_1 ∧ -b^{1, 31}_0 ∧ true) 
c  in CNF:
c    -b^{1, 31}_2 ∨  b^{1, 31}_1 ∨  b^{1, 31}_0 ∨ false 
c  in DIMACS:
-1253  1254  1255  0

c  3 does not represent an automaton state.
c    -(-b^{1, 31}_2 ∧  b^{1, 31}_1 ∧  b^{1, 31}_0 ∧ true) 
c  in CNF:
c     b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ false 
c  in DIMACS:
 1253 -1254 -1255  0
c  -3 does not represent an automaton state.
c    -( b^{1, 31}_2 ∧  b^{1, 31}_1 ∧  b^{1, 31}_0 ∧ true) 
c  in CNF:
c    -b^{1, 31}_2 ∨ -b^{1, 31}_1 ∨ -b^{1, 31}_0 ∨ false 
c  in DIMACS:
-1253 -1254 -1255  0

c i = 32
c  -2+1 --> -1
c    ( b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧  p_32) -> ( b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0)
c  in CNF:
c    -b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨  b^{1, 33}_2
c    -b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_1
c    -b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨  b^{1, 33}_0
c  in DIMACS:
-1256 -1257  1258 -32  1259 0
-1256 -1257  1258 -32 -1260 0
-1256 -1257  1258 -32  1261 0

c  -1+1 --> 0
c    ( b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0 ∧  p_32) -> (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧ -b^{1, 33}_0)
c  in CNF:
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_2
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_1
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_0
c  in DIMACS:
-1256  1257 -1258 -32 -1259 0
-1256  1257 -1258 -32 -1260 0
-1256  1257 -1258 -32 -1261 0

c  0+1 --> 1
c    (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧  p_32) -> (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0)
c  in CNF:
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_2
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_1
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨  b^{1, 33}_0
c  in DIMACS:
 1256  1257  1258 -32 -1259 0
 1256  1257  1258 -32 -1260 0
 1256  1257  1258 -32  1261 0

c  1+1 --> 2
c    (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0 ∧  p_32) -> (-b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0)
c  in CNF:
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_2
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨  b^{1, 33}_1
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ -p_32 ∨ -b^{1, 33}_0
c  in DIMACS:
 1256  1257 -1258 -32 -1259 0
 1256  1257 -1258 -32  1260 0
 1256  1257 -1258 -32 -1261 0

c  2+1 --> break 
c    (-b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧  p_32) -> break
c  in CNF:
c     b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 1256 -1257  1258 -32 1162 0


c  2-1 --> 1
c    (-b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧ -p_32) -> (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0)
c  in CNF:
c     b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_2
c     b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_1
c     b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨  b^{1, 33}_0
c  in DIMACS:
 1256 -1257  1258  32 -1259 0
 1256 -1257  1258  32 -1260 0
 1256 -1257  1258  32  1261 0

c  1-1 --> 0
c    (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0 ∧ -p_32) -> (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧ -b^{1, 33}_0)
c  in CNF:
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_2
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_1
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_0
c  in DIMACS:
 1256  1257 -1258  32 -1259 0
 1256  1257 -1258  32 -1260 0
 1256  1257 -1258  32 -1261 0

c  0-1 --> -1
c    (-b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧ -p_32) -> ( b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0)
c  in CNF:
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨  b^{1, 33}_2
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_1
c     b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨  b^{1, 33}_0
c  in DIMACS:
 1256  1257  1258  32  1259 0
 1256  1257  1258  32 -1260 0
 1256  1257  1258  32  1261 0

c  -1-1 --> -2
c    ( b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧  b^{1, 32}_0 ∧ -p_32) -> ( b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0)
c  in CNF:
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨  b^{1, 33}_2
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨  b^{1, 33}_1
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨  p_32 ∨ -b^{1, 33}_0
c  in DIMACS:
-1256  1257 -1258  32  1259 0
-1256  1257 -1258  32  1260 0
-1256  1257 -1258  32 -1261 0

c  -2-1 --> break 
c    ( b^{1, 32}_2 ∧  b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨  b^{1, 32}_0 ∨  p_32 ∨ break
c  in DIMACS:
-1256 -1257  1258  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 32}_2 ∧ -b^{1, 32}_1 ∧ -b^{1, 32}_0 ∧ true) 
c  in CNF:
c    -b^{1, 32}_2 ∨  b^{1, 32}_1 ∨  b^{1, 32}_0 ∨ false 
c  in DIMACS:
-1256  1257  1258  0

c  3 does not represent an automaton state.
c    -(-b^{1, 32}_2 ∧  b^{1, 32}_1 ∧  b^{1, 32}_0 ∧ true) 
c  in CNF:
c     b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ false 
c  in DIMACS:
 1256 -1257 -1258  0
c  -3 does not represent an automaton state.
c    -( b^{1, 32}_2 ∧  b^{1, 32}_1 ∧  b^{1, 32}_0 ∧ true) 
c  in CNF:
c    -b^{1, 32}_2 ∨ -b^{1, 32}_1 ∨ -b^{1, 32}_0 ∨ false 
c  in DIMACS:
-1256 -1257 -1258  0

c i = 33
c  -2+1 --> -1
c    ( b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧  p_33) -> ( b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0)
c  in CNF:
c    -b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨  b^{1, 34}_2
c    -b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_1
c    -b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨  b^{1, 34}_0
c  in DIMACS:
-1259 -1260  1261 -33  1262 0
-1259 -1260  1261 -33 -1263 0
-1259 -1260  1261 -33  1264 0

c  -1+1 --> 0
c    ( b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0 ∧  p_33) -> (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧ -b^{1, 34}_0)
c  in CNF:
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_2
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_1
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_0
c  in DIMACS:
-1259  1260 -1261 -33 -1262 0
-1259  1260 -1261 -33 -1263 0
-1259  1260 -1261 -33 -1264 0

c  0+1 --> 1
c    (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧  p_33) -> (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0)
c  in CNF:
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_2
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_1
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨  b^{1, 34}_0
c  in DIMACS:
 1259  1260  1261 -33 -1262 0
 1259  1260  1261 -33 -1263 0
 1259  1260  1261 -33  1264 0

c  1+1 --> 2
c    (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0 ∧  p_33) -> (-b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0)
c  in CNF:
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_2
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨  b^{1, 34}_1
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ -p_33 ∨ -b^{1, 34}_0
c  in DIMACS:
 1259  1260 -1261 -33 -1262 0
 1259  1260 -1261 -33  1263 0
 1259  1260 -1261 -33 -1264 0

c  2+1 --> break 
c    (-b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧  p_33) -> break
c  in CNF:
c     b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ -p_33 ∨ break
c  in DIMACS:
 1259 -1260  1261 -33 1162 0


c  2-1 --> 1
c    (-b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧ -p_33) -> (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0)
c  in CNF:
c     b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_2
c     b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_1
c     b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨  b^{1, 34}_0
c  in DIMACS:
 1259 -1260  1261  33 -1262 0
 1259 -1260  1261  33 -1263 0
 1259 -1260  1261  33  1264 0

c  1-1 --> 0
c    (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0 ∧ -p_33) -> (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧ -b^{1, 34}_0)
c  in CNF:
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_2
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_1
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_0
c  in DIMACS:
 1259  1260 -1261  33 -1262 0
 1259  1260 -1261  33 -1263 0
 1259  1260 -1261  33 -1264 0

c  0-1 --> -1
c    (-b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧ -p_33) -> ( b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0)
c  in CNF:
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨  b^{1, 34}_2
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_1
c     b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨  b^{1, 34}_0
c  in DIMACS:
 1259  1260  1261  33  1262 0
 1259  1260  1261  33 -1263 0
 1259  1260  1261  33  1264 0

c  -1-1 --> -2
c    ( b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧  b^{1, 33}_0 ∧ -p_33) -> ( b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0)
c  in CNF:
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨  b^{1, 34}_2
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨  b^{1, 34}_1
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨  p_33 ∨ -b^{1, 34}_0
c  in DIMACS:
-1259  1260 -1261  33  1262 0
-1259  1260 -1261  33  1263 0
-1259  1260 -1261  33 -1264 0

c  -2-1 --> break 
c    ( b^{1, 33}_2 ∧  b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧ -p_33) -> break
c  in CNF:
c    -b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨  b^{1, 33}_0 ∨  p_33 ∨ break
c  in DIMACS:
-1259 -1260  1261  33 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 33}_2 ∧ -b^{1, 33}_1 ∧ -b^{1, 33}_0 ∧ true) 
c  in CNF:
c    -b^{1, 33}_2 ∨  b^{1, 33}_1 ∨  b^{1, 33}_0 ∨ false 
c  in DIMACS:
-1259  1260  1261  0

c  3 does not represent an automaton state.
c    -(-b^{1, 33}_2 ∧  b^{1, 33}_1 ∧  b^{1, 33}_0 ∧ true) 
c  in CNF:
c     b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ false 
c  in DIMACS:
 1259 -1260 -1261  0
c  -3 does not represent an automaton state.
c    -( b^{1, 33}_2 ∧  b^{1, 33}_1 ∧  b^{1, 33}_0 ∧ true) 
c  in CNF:
c    -b^{1, 33}_2 ∨ -b^{1, 33}_1 ∨ -b^{1, 33}_0 ∨ false 
c  in DIMACS:
-1259 -1260 -1261  0

c i = 34
c  -2+1 --> -1
c    ( b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧  p_34) -> ( b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0)
c  in CNF:
c    -b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨  b^{1, 35}_2
c    -b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_1
c    -b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨  b^{1, 35}_0
c  in DIMACS:
-1262 -1263  1264 -34  1265 0
-1262 -1263  1264 -34 -1266 0
-1262 -1263  1264 -34  1267 0

c  -1+1 --> 0
c    ( b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0 ∧  p_34) -> (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧ -b^{1, 35}_0)
c  in CNF:
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_2
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_1
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_0
c  in DIMACS:
-1262  1263 -1264 -34 -1265 0
-1262  1263 -1264 -34 -1266 0
-1262  1263 -1264 -34 -1267 0

c  0+1 --> 1
c    (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧  p_34) -> (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0)
c  in CNF:
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_2
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_1
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨  b^{1, 35}_0
c  in DIMACS:
 1262  1263  1264 -34 -1265 0
 1262  1263  1264 -34 -1266 0
 1262  1263  1264 -34  1267 0

c  1+1 --> 2
c    (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0 ∧  p_34) -> (-b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0)
c  in CNF:
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_2
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨  b^{1, 35}_1
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ -p_34 ∨ -b^{1, 35}_0
c  in DIMACS:
 1262  1263 -1264 -34 -1265 0
 1262  1263 -1264 -34  1266 0
 1262  1263 -1264 -34 -1267 0

c  2+1 --> break 
c    (-b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧  p_34) -> break
c  in CNF:
c     b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ -p_34 ∨ break
c  in DIMACS:
 1262 -1263  1264 -34 1162 0


c  2-1 --> 1
c    (-b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧ -p_34) -> (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0)
c  in CNF:
c     b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_2
c     b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_1
c     b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨  b^{1, 35}_0
c  in DIMACS:
 1262 -1263  1264  34 -1265 0
 1262 -1263  1264  34 -1266 0
 1262 -1263  1264  34  1267 0

c  1-1 --> 0
c    (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0 ∧ -p_34) -> (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧ -b^{1, 35}_0)
c  in CNF:
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_2
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_1
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_0
c  in DIMACS:
 1262  1263 -1264  34 -1265 0
 1262  1263 -1264  34 -1266 0
 1262  1263 -1264  34 -1267 0

c  0-1 --> -1
c    (-b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧ -p_34) -> ( b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0)
c  in CNF:
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨  b^{1, 35}_2
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_1
c     b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨  b^{1, 35}_0
c  in DIMACS:
 1262  1263  1264  34  1265 0
 1262  1263  1264  34 -1266 0
 1262  1263  1264  34  1267 0

c  -1-1 --> -2
c    ( b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧  b^{1, 34}_0 ∧ -p_34) -> ( b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0)
c  in CNF:
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨  b^{1, 35}_2
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨  b^{1, 35}_1
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨  p_34 ∨ -b^{1, 35}_0
c  in DIMACS:
-1262  1263 -1264  34  1265 0
-1262  1263 -1264  34  1266 0
-1262  1263 -1264  34 -1267 0

c  -2-1 --> break 
c    ( b^{1, 34}_2 ∧  b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧ -p_34) -> break
c  in CNF:
c    -b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨  b^{1, 34}_0 ∨  p_34 ∨ break
c  in DIMACS:
-1262 -1263  1264  34 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 34}_2 ∧ -b^{1, 34}_1 ∧ -b^{1, 34}_0 ∧ true) 
c  in CNF:
c    -b^{1, 34}_2 ∨  b^{1, 34}_1 ∨  b^{1, 34}_0 ∨ false 
c  in DIMACS:
-1262  1263  1264  0

c  3 does not represent an automaton state.
c    -(-b^{1, 34}_2 ∧  b^{1, 34}_1 ∧  b^{1, 34}_0 ∧ true) 
c  in CNF:
c     b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ false 
c  in DIMACS:
 1262 -1263 -1264  0
c  -3 does not represent an automaton state.
c    -( b^{1, 34}_2 ∧  b^{1, 34}_1 ∧  b^{1, 34}_0 ∧ true) 
c  in CNF:
c    -b^{1, 34}_2 ∨ -b^{1, 34}_1 ∨ -b^{1, 34}_0 ∨ false 
c  in DIMACS:
-1262 -1263 -1264  0

c i = 35
c  -2+1 --> -1
c    ( b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧  p_35) -> ( b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0)
c  in CNF:
c    -b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨  b^{1, 36}_2
c    -b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_1
c    -b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨  b^{1, 36}_0
c  in DIMACS:
-1265 -1266  1267 -35  1268 0
-1265 -1266  1267 -35 -1269 0
-1265 -1266  1267 -35  1270 0

c  -1+1 --> 0
c    ( b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0 ∧  p_35) -> (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧ -b^{1, 36}_0)
c  in CNF:
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_2
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_1
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_0
c  in DIMACS:
-1265  1266 -1267 -35 -1268 0
-1265  1266 -1267 -35 -1269 0
-1265  1266 -1267 -35 -1270 0

c  0+1 --> 1
c    (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧  p_35) -> (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0)
c  in CNF:
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_2
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_1
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨  b^{1, 36}_0
c  in DIMACS:
 1265  1266  1267 -35 -1268 0
 1265  1266  1267 -35 -1269 0
 1265  1266  1267 -35  1270 0

c  1+1 --> 2
c    (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0 ∧  p_35) -> (-b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0)
c  in CNF:
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_2
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨  b^{1, 36}_1
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ -p_35 ∨ -b^{1, 36}_0
c  in DIMACS:
 1265  1266 -1267 -35 -1268 0
 1265  1266 -1267 -35  1269 0
 1265  1266 -1267 -35 -1270 0

c  2+1 --> break 
c    (-b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧  p_35) -> break
c  in CNF:
c     b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ -p_35 ∨ break
c  in DIMACS:
 1265 -1266  1267 -35 1162 0


c  2-1 --> 1
c    (-b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧ -p_35) -> (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0)
c  in CNF:
c     b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_2
c     b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_1
c     b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨  b^{1, 36}_0
c  in DIMACS:
 1265 -1266  1267  35 -1268 0
 1265 -1266  1267  35 -1269 0
 1265 -1266  1267  35  1270 0

c  1-1 --> 0
c    (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0 ∧ -p_35) -> (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧ -b^{1, 36}_0)
c  in CNF:
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_2
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_1
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_0
c  in DIMACS:
 1265  1266 -1267  35 -1268 0
 1265  1266 -1267  35 -1269 0
 1265  1266 -1267  35 -1270 0

c  0-1 --> -1
c    (-b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧ -p_35) -> ( b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0)
c  in CNF:
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨  b^{1, 36}_2
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_1
c     b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨  b^{1, 36}_0
c  in DIMACS:
 1265  1266  1267  35  1268 0
 1265  1266  1267  35 -1269 0
 1265  1266  1267  35  1270 0

c  -1-1 --> -2
c    ( b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧  b^{1, 35}_0 ∧ -p_35) -> ( b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0)
c  in CNF:
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨  b^{1, 36}_2
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨  b^{1, 36}_1
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨  p_35 ∨ -b^{1, 36}_0
c  in DIMACS:
-1265  1266 -1267  35  1268 0
-1265  1266 -1267  35  1269 0
-1265  1266 -1267  35 -1270 0

c  -2-1 --> break 
c    ( b^{1, 35}_2 ∧  b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧ -p_35) -> break
c  in CNF:
c    -b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨  b^{1, 35}_0 ∨  p_35 ∨ break
c  in DIMACS:
-1265 -1266  1267  35 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 35}_2 ∧ -b^{1, 35}_1 ∧ -b^{1, 35}_0 ∧ true) 
c  in CNF:
c    -b^{1, 35}_2 ∨  b^{1, 35}_1 ∨  b^{1, 35}_0 ∨ false 
c  in DIMACS:
-1265  1266  1267  0

c  3 does not represent an automaton state.
c    -(-b^{1, 35}_2 ∧  b^{1, 35}_1 ∧  b^{1, 35}_0 ∧ true) 
c  in CNF:
c     b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ false 
c  in DIMACS:
 1265 -1266 -1267  0
c  -3 does not represent an automaton state.
c    -( b^{1, 35}_2 ∧  b^{1, 35}_1 ∧  b^{1, 35}_0 ∧ true) 
c  in CNF:
c    -b^{1, 35}_2 ∨ -b^{1, 35}_1 ∨ -b^{1, 35}_0 ∨ false 
c  in DIMACS:
-1265 -1266 -1267  0

c i = 36
c  -2+1 --> -1
c    ( b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧  p_36) -> ( b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0)
c  in CNF:
c    -b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨  b^{1, 37}_2
c    -b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_1
c    -b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨  b^{1, 37}_0
c  in DIMACS:
-1268 -1269  1270 -36  1271 0
-1268 -1269  1270 -36 -1272 0
-1268 -1269  1270 -36  1273 0

c  -1+1 --> 0
c    ( b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0 ∧  p_36) -> (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧ -b^{1, 37}_0)
c  in CNF:
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_2
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_1
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_0
c  in DIMACS:
-1268  1269 -1270 -36 -1271 0
-1268  1269 -1270 -36 -1272 0
-1268  1269 -1270 -36 -1273 0

c  0+1 --> 1
c    (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧  p_36) -> (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0)
c  in CNF:
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_2
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_1
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨  b^{1, 37}_0
c  in DIMACS:
 1268  1269  1270 -36 -1271 0
 1268  1269  1270 -36 -1272 0
 1268  1269  1270 -36  1273 0

c  1+1 --> 2
c    (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0 ∧  p_36) -> (-b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0)
c  in CNF:
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_2
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨  b^{1, 37}_1
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ -p_36 ∨ -b^{1, 37}_0
c  in DIMACS:
 1268  1269 -1270 -36 -1271 0
 1268  1269 -1270 -36  1272 0
 1268  1269 -1270 -36 -1273 0

c  2+1 --> break 
c    (-b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧  p_36) -> break
c  in CNF:
c     b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 1268 -1269  1270 -36 1162 0


c  2-1 --> 1
c    (-b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧ -p_36) -> (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0)
c  in CNF:
c     b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_2
c     b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_1
c     b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨  b^{1, 37}_0
c  in DIMACS:
 1268 -1269  1270  36 -1271 0
 1268 -1269  1270  36 -1272 0
 1268 -1269  1270  36  1273 0

c  1-1 --> 0
c    (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0 ∧ -p_36) -> (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧ -b^{1, 37}_0)
c  in CNF:
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_2
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_1
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_0
c  in DIMACS:
 1268  1269 -1270  36 -1271 0
 1268  1269 -1270  36 -1272 0
 1268  1269 -1270  36 -1273 0

c  0-1 --> -1
c    (-b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧ -p_36) -> ( b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0)
c  in CNF:
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨  b^{1, 37}_2
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_1
c     b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨  b^{1, 37}_0
c  in DIMACS:
 1268  1269  1270  36  1271 0
 1268  1269  1270  36 -1272 0
 1268  1269  1270  36  1273 0

c  -1-1 --> -2
c    ( b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧  b^{1, 36}_0 ∧ -p_36) -> ( b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0)
c  in CNF:
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨  b^{1, 37}_2
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨  b^{1, 37}_1
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨  p_36 ∨ -b^{1, 37}_0
c  in DIMACS:
-1268  1269 -1270  36  1271 0
-1268  1269 -1270  36  1272 0
-1268  1269 -1270  36 -1273 0

c  -2-1 --> break 
c    ( b^{1, 36}_2 ∧  b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨  b^{1, 36}_0 ∨  p_36 ∨ break
c  in DIMACS:
-1268 -1269  1270  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 36}_2 ∧ -b^{1, 36}_1 ∧ -b^{1, 36}_0 ∧ true) 
c  in CNF:
c    -b^{1, 36}_2 ∨  b^{1, 36}_1 ∨  b^{1, 36}_0 ∨ false 
c  in DIMACS:
-1268  1269  1270  0

c  3 does not represent an automaton state.
c    -(-b^{1, 36}_2 ∧  b^{1, 36}_1 ∧  b^{1, 36}_0 ∧ true) 
c  in CNF:
c     b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ false 
c  in DIMACS:
 1268 -1269 -1270  0
c  -3 does not represent an automaton state.
c    -( b^{1, 36}_2 ∧  b^{1, 36}_1 ∧  b^{1, 36}_0 ∧ true) 
c  in CNF:
c    -b^{1, 36}_2 ∨ -b^{1, 36}_1 ∨ -b^{1, 36}_0 ∨ false 
c  in DIMACS:
-1268 -1269 -1270  0

c i = 37
c  -2+1 --> -1
c    ( b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧  p_37) -> ( b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0)
c  in CNF:
c    -b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨  b^{1, 38}_2
c    -b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_1
c    -b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨  b^{1, 38}_0
c  in DIMACS:
-1271 -1272  1273 -37  1274 0
-1271 -1272  1273 -37 -1275 0
-1271 -1272  1273 -37  1276 0

c  -1+1 --> 0
c    ( b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0 ∧  p_37) -> (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧ -b^{1, 38}_0)
c  in CNF:
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_2
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_1
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_0
c  in DIMACS:
-1271  1272 -1273 -37 -1274 0
-1271  1272 -1273 -37 -1275 0
-1271  1272 -1273 -37 -1276 0

c  0+1 --> 1
c    (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧  p_37) -> (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0)
c  in CNF:
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_2
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_1
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨  b^{1, 38}_0
c  in DIMACS:
 1271  1272  1273 -37 -1274 0
 1271  1272  1273 -37 -1275 0
 1271  1272  1273 -37  1276 0

c  1+1 --> 2
c    (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0 ∧  p_37) -> (-b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0)
c  in CNF:
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_2
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨  b^{1, 38}_1
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ -p_37 ∨ -b^{1, 38}_0
c  in DIMACS:
 1271  1272 -1273 -37 -1274 0
 1271  1272 -1273 -37  1275 0
 1271  1272 -1273 -37 -1276 0

c  2+1 --> break 
c    (-b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧  p_37) -> break
c  in CNF:
c     b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ -p_37 ∨ break
c  in DIMACS:
 1271 -1272  1273 -37 1162 0


c  2-1 --> 1
c    (-b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧ -p_37) -> (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0)
c  in CNF:
c     b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_2
c     b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_1
c     b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨  b^{1, 38}_0
c  in DIMACS:
 1271 -1272  1273  37 -1274 0
 1271 -1272  1273  37 -1275 0
 1271 -1272  1273  37  1276 0

c  1-1 --> 0
c    (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0 ∧ -p_37) -> (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧ -b^{1, 38}_0)
c  in CNF:
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_2
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_1
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_0
c  in DIMACS:
 1271  1272 -1273  37 -1274 0
 1271  1272 -1273  37 -1275 0
 1271  1272 -1273  37 -1276 0

c  0-1 --> -1
c    (-b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧ -p_37) -> ( b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0)
c  in CNF:
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨  b^{1, 38}_2
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_1
c     b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨  b^{1, 38}_0
c  in DIMACS:
 1271  1272  1273  37  1274 0
 1271  1272  1273  37 -1275 0
 1271  1272  1273  37  1276 0

c  -1-1 --> -2
c    ( b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧  b^{1, 37}_0 ∧ -p_37) -> ( b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0)
c  in CNF:
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨  b^{1, 38}_2
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨  b^{1, 38}_1
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨  p_37 ∨ -b^{1, 38}_0
c  in DIMACS:
-1271  1272 -1273  37  1274 0
-1271  1272 -1273  37  1275 0
-1271  1272 -1273  37 -1276 0

c  -2-1 --> break 
c    ( b^{1, 37}_2 ∧  b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧ -p_37) -> break
c  in CNF:
c    -b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨  b^{1, 37}_0 ∨  p_37 ∨ break
c  in DIMACS:
-1271 -1272  1273  37 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 37}_2 ∧ -b^{1, 37}_1 ∧ -b^{1, 37}_0 ∧ true) 
c  in CNF:
c    -b^{1, 37}_2 ∨  b^{1, 37}_1 ∨  b^{1, 37}_0 ∨ false 
c  in DIMACS:
-1271  1272  1273  0

c  3 does not represent an automaton state.
c    -(-b^{1, 37}_2 ∧  b^{1, 37}_1 ∧  b^{1, 37}_0 ∧ true) 
c  in CNF:
c     b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ false 
c  in DIMACS:
 1271 -1272 -1273  0
c  -3 does not represent an automaton state.
c    -( b^{1, 37}_2 ∧  b^{1, 37}_1 ∧  b^{1, 37}_0 ∧ true) 
c  in CNF:
c    -b^{1, 37}_2 ∨ -b^{1, 37}_1 ∨ -b^{1, 37}_0 ∨ false 
c  in DIMACS:
-1271 -1272 -1273  0

c i = 38
c  -2+1 --> -1
c    ( b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧  p_38) -> ( b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0)
c  in CNF:
c    -b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨  b^{1, 39}_2
c    -b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_1
c    -b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨  b^{1, 39}_0
c  in DIMACS:
-1274 -1275  1276 -38  1277 0
-1274 -1275  1276 -38 -1278 0
-1274 -1275  1276 -38  1279 0

c  -1+1 --> 0
c    ( b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0 ∧  p_38) -> (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧ -b^{1, 39}_0)
c  in CNF:
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_2
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_1
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_0
c  in DIMACS:
-1274  1275 -1276 -38 -1277 0
-1274  1275 -1276 -38 -1278 0
-1274  1275 -1276 -38 -1279 0

c  0+1 --> 1
c    (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧  p_38) -> (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0)
c  in CNF:
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_2
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_1
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨  b^{1, 39}_0
c  in DIMACS:
 1274  1275  1276 -38 -1277 0
 1274  1275  1276 -38 -1278 0
 1274  1275  1276 -38  1279 0

c  1+1 --> 2
c    (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0 ∧  p_38) -> (-b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0)
c  in CNF:
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_2
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨  b^{1, 39}_1
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ -p_38 ∨ -b^{1, 39}_0
c  in DIMACS:
 1274  1275 -1276 -38 -1277 0
 1274  1275 -1276 -38  1278 0
 1274  1275 -1276 -38 -1279 0

c  2+1 --> break 
c    (-b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧  p_38) -> break
c  in CNF:
c     b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ -p_38 ∨ break
c  in DIMACS:
 1274 -1275  1276 -38 1162 0


c  2-1 --> 1
c    (-b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧ -p_38) -> (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0)
c  in CNF:
c     b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_2
c     b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_1
c     b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨  b^{1, 39}_0
c  in DIMACS:
 1274 -1275  1276  38 -1277 0
 1274 -1275  1276  38 -1278 0
 1274 -1275  1276  38  1279 0

c  1-1 --> 0
c    (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0 ∧ -p_38) -> (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧ -b^{1, 39}_0)
c  in CNF:
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_2
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_1
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_0
c  in DIMACS:
 1274  1275 -1276  38 -1277 0
 1274  1275 -1276  38 -1278 0
 1274  1275 -1276  38 -1279 0

c  0-1 --> -1
c    (-b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧ -p_38) -> ( b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0)
c  in CNF:
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨  b^{1, 39}_2
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_1
c     b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨  b^{1, 39}_0
c  in DIMACS:
 1274  1275  1276  38  1277 0
 1274  1275  1276  38 -1278 0
 1274  1275  1276  38  1279 0

c  -1-1 --> -2
c    ( b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧  b^{1, 38}_0 ∧ -p_38) -> ( b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0)
c  in CNF:
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨  b^{1, 39}_2
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨  b^{1, 39}_1
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨  p_38 ∨ -b^{1, 39}_0
c  in DIMACS:
-1274  1275 -1276  38  1277 0
-1274  1275 -1276  38  1278 0
-1274  1275 -1276  38 -1279 0

c  -2-1 --> break 
c    ( b^{1, 38}_2 ∧  b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧ -p_38) -> break
c  in CNF:
c    -b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨  b^{1, 38}_0 ∨  p_38 ∨ break
c  in DIMACS:
-1274 -1275  1276  38 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 38}_2 ∧ -b^{1, 38}_1 ∧ -b^{1, 38}_0 ∧ true) 
c  in CNF:
c    -b^{1, 38}_2 ∨  b^{1, 38}_1 ∨  b^{1, 38}_0 ∨ false 
c  in DIMACS:
-1274  1275  1276  0

c  3 does not represent an automaton state.
c    -(-b^{1, 38}_2 ∧  b^{1, 38}_1 ∧  b^{1, 38}_0 ∧ true) 
c  in CNF:
c     b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ false 
c  in DIMACS:
 1274 -1275 -1276  0
c  -3 does not represent an automaton state.
c    -( b^{1, 38}_2 ∧  b^{1, 38}_1 ∧  b^{1, 38}_0 ∧ true) 
c  in CNF:
c    -b^{1, 38}_2 ∨ -b^{1, 38}_1 ∨ -b^{1, 38}_0 ∨ false 
c  in DIMACS:
-1274 -1275 -1276  0

c i = 39
c  -2+1 --> -1
c    ( b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧  p_39) -> ( b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0)
c  in CNF:
c    -b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨  b^{1, 40}_2
c    -b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_1
c    -b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨  b^{1, 40}_0
c  in DIMACS:
-1277 -1278  1279 -39  1280 0
-1277 -1278  1279 -39 -1281 0
-1277 -1278  1279 -39  1282 0

c  -1+1 --> 0
c    ( b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0 ∧  p_39) -> (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧ -b^{1, 40}_0)
c  in CNF:
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_2
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_1
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_0
c  in DIMACS:
-1277  1278 -1279 -39 -1280 0
-1277  1278 -1279 -39 -1281 0
-1277  1278 -1279 -39 -1282 0

c  0+1 --> 1
c    (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧  p_39) -> (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0)
c  in CNF:
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_2
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_1
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨  b^{1, 40}_0
c  in DIMACS:
 1277  1278  1279 -39 -1280 0
 1277  1278  1279 -39 -1281 0
 1277  1278  1279 -39  1282 0

c  1+1 --> 2
c    (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0 ∧  p_39) -> (-b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0)
c  in CNF:
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_2
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨  b^{1, 40}_1
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ -p_39 ∨ -b^{1, 40}_0
c  in DIMACS:
 1277  1278 -1279 -39 -1280 0
 1277  1278 -1279 -39  1281 0
 1277  1278 -1279 -39 -1282 0

c  2+1 --> break 
c    (-b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧  p_39) -> break
c  in CNF:
c     b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ -p_39 ∨ break
c  in DIMACS:
 1277 -1278  1279 -39 1162 0


c  2-1 --> 1
c    (-b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧ -p_39) -> (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0)
c  in CNF:
c     b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_2
c     b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_1
c     b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨  b^{1, 40}_0
c  in DIMACS:
 1277 -1278  1279  39 -1280 0
 1277 -1278  1279  39 -1281 0
 1277 -1278  1279  39  1282 0

c  1-1 --> 0
c    (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0 ∧ -p_39) -> (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧ -b^{1, 40}_0)
c  in CNF:
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_2
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_1
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_0
c  in DIMACS:
 1277  1278 -1279  39 -1280 0
 1277  1278 -1279  39 -1281 0
 1277  1278 -1279  39 -1282 0

c  0-1 --> -1
c    (-b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧ -p_39) -> ( b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0)
c  in CNF:
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨  b^{1, 40}_2
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_1
c     b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨  b^{1, 40}_0
c  in DIMACS:
 1277  1278  1279  39  1280 0
 1277  1278  1279  39 -1281 0
 1277  1278  1279  39  1282 0

c  -1-1 --> -2
c    ( b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧  b^{1, 39}_0 ∧ -p_39) -> ( b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0)
c  in CNF:
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨  b^{1, 40}_2
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨  b^{1, 40}_1
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨  p_39 ∨ -b^{1, 40}_0
c  in DIMACS:
-1277  1278 -1279  39  1280 0
-1277  1278 -1279  39  1281 0
-1277  1278 -1279  39 -1282 0

c  -2-1 --> break 
c    ( b^{1, 39}_2 ∧  b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧ -p_39) -> break
c  in CNF:
c    -b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨  b^{1, 39}_0 ∨  p_39 ∨ break
c  in DIMACS:
-1277 -1278  1279  39 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 39}_2 ∧ -b^{1, 39}_1 ∧ -b^{1, 39}_0 ∧ true) 
c  in CNF:
c    -b^{1, 39}_2 ∨  b^{1, 39}_1 ∨  b^{1, 39}_0 ∨ false 
c  in DIMACS:
-1277  1278  1279  0

c  3 does not represent an automaton state.
c    -(-b^{1, 39}_2 ∧  b^{1, 39}_1 ∧  b^{1, 39}_0 ∧ true) 
c  in CNF:
c     b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ false 
c  in DIMACS:
 1277 -1278 -1279  0
c  -3 does not represent an automaton state.
c    -( b^{1, 39}_2 ∧  b^{1, 39}_1 ∧  b^{1, 39}_0 ∧ true) 
c  in CNF:
c    -b^{1, 39}_2 ∨ -b^{1, 39}_1 ∨ -b^{1, 39}_0 ∨ false 
c  in DIMACS:
-1277 -1278 -1279  0

c i = 40
c  -2+1 --> -1
c    ( b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧  p_40) -> ( b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0)
c  in CNF:
c    -b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨  b^{1, 41}_2
c    -b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_1
c    -b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨  b^{1, 41}_0
c  in DIMACS:
-1280 -1281  1282 -40  1283 0
-1280 -1281  1282 -40 -1284 0
-1280 -1281  1282 -40  1285 0

c  -1+1 --> 0
c    ( b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0 ∧  p_40) -> (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧ -b^{1, 41}_0)
c  in CNF:
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_2
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_1
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_0
c  in DIMACS:
-1280  1281 -1282 -40 -1283 0
-1280  1281 -1282 -40 -1284 0
-1280  1281 -1282 -40 -1285 0

c  0+1 --> 1
c    (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧  p_40) -> (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0)
c  in CNF:
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_2
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_1
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨  b^{1, 41}_0
c  in DIMACS:
 1280  1281  1282 -40 -1283 0
 1280  1281  1282 -40 -1284 0
 1280  1281  1282 -40  1285 0

c  1+1 --> 2
c    (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0 ∧  p_40) -> (-b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0)
c  in CNF:
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_2
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨  b^{1, 41}_1
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ -p_40 ∨ -b^{1, 41}_0
c  in DIMACS:
 1280  1281 -1282 -40 -1283 0
 1280  1281 -1282 -40  1284 0
 1280  1281 -1282 -40 -1285 0

c  2+1 --> break 
c    (-b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧  p_40) -> break
c  in CNF:
c     b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 1280 -1281  1282 -40 1162 0


c  2-1 --> 1
c    (-b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧ -p_40) -> (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0)
c  in CNF:
c     b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_2
c     b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_1
c     b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨  b^{1, 41}_0
c  in DIMACS:
 1280 -1281  1282  40 -1283 0
 1280 -1281  1282  40 -1284 0
 1280 -1281  1282  40  1285 0

c  1-1 --> 0
c    (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0 ∧ -p_40) -> (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧ -b^{1, 41}_0)
c  in CNF:
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_2
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_1
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_0
c  in DIMACS:
 1280  1281 -1282  40 -1283 0
 1280  1281 -1282  40 -1284 0
 1280  1281 -1282  40 -1285 0

c  0-1 --> -1
c    (-b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧ -p_40) -> ( b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0)
c  in CNF:
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨  b^{1, 41}_2
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_1
c     b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨  b^{1, 41}_0
c  in DIMACS:
 1280  1281  1282  40  1283 0
 1280  1281  1282  40 -1284 0
 1280  1281  1282  40  1285 0

c  -1-1 --> -2
c    ( b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧  b^{1, 40}_0 ∧ -p_40) -> ( b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0)
c  in CNF:
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨  b^{1, 41}_2
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨  b^{1, 41}_1
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨  p_40 ∨ -b^{1, 41}_0
c  in DIMACS:
-1280  1281 -1282  40  1283 0
-1280  1281 -1282  40  1284 0
-1280  1281 -1282  40 -1285 0

c  -2-1 --> break 
c    ( b^{1, 40}_2 ∧  b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨  b^{1, 40}_0 ∨  p_40 ∨ break
c  in DIMACS:
-1280 -1281  1282  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 40}_2 ∧ -b^{1, 40}_1 ∧ -b^{1, 40}_0 ∧ true) 
c  in CNF:
c    -b^{1, 40}_2 ∨  b^{1, 40}_1 ∨  b^{1, 40}_0 ∨ false 
c  in DIMACS:
-1280  1281  1282  0

c  3 does not represent an automaton state.
c    -(-b^{1, 40}_2 ∧  b^{1, 40}_1 ∧  b^{1, 40}_0 ∧ true) 
c  in CNF:
c     b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ false 
c  in DIMACS:
 1280 -1281 -1282  0
c  -3 does not represent an automaton state.
c    -( b^{1, 40}_2 ∧  b^{1, 40}_1 ∧  b^{1, 40}_0 ∧ true) 
c  in CNF:
c    -b^{1, 40}_2 ∨ -b^{1, 40}_1 ∨ -b^{1, 40}_0 ∨ false 
c  in DIMACS:
-1280 -1281 -1282  0

c i = 41
c  -2+1 --> -1
c    ( b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧  p_41) -> ( b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0)
c  in CNF:
c    -b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨  b^{1, 42}_2
c    -b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_1
c    -b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨  b^{1, 42}_0
c  in DIMACS:
-1283 -1284  1285 -41  1286 0
-1283 -1284  1285 -41 -1287 0
-1283 -1284  1285 -41  1288 0

c  -1+1 --> 0
c    ( b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0 ∧  p_41) -> (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧ -b^{1, 42}_0)
c  in CNF:
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_2
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_1
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_0
c  in DIMACS:
-1283  1284 -1285 -41 -1286 0
-1283  1284 -1285 -41 -1287 0
-1283  1284 -1285 -41 -1288 0

c  0+1 --> 1
c    (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧  p_41) -> (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0)
c  in CNF:
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_2
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_1
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨  b^{1, 42}_0
c  in DIMACS:
 1283  1284  1285 -41 -1286 0
 1283  1284  1285 -41 -1287 0
 1283  1284  1285 -41  1288 0

c  1+1 --> 2
c    (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0 ∧  p_41) -> (-b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0)
c  in CNF:
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_2
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨  b^{1, 42}_1
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ -p_41 ∨ -b^{1, 42}_0
c  in DIMACS:
 1283  1284 -1285 -41 -1286 0
 1283  1284 -1285 -41  1287 0
 1283  1284 -1285 -41 -1288 0

c  2+1 --> break 
c    (-b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧  p_41) -> break
c  in CNF:
c     b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ -p_41 ∨ break
c  in DIMACS:
 1283 -1284  1285 -41 1162 0


c  2-1 --> 1
c    (-b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧ -p_41) -> (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0)
c  in CNF:
c     b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_2
c     b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_1
c     b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨  b^{1, 42}_0
c  in DIMACS:
 1283 -1284  1285  41 -1286 0
 1283 -1284  1285  41 -1287 0
 1283 -1284  1285  41  1288 0

c  1-1 --> 0
c    (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0 ∧ -p_41) -> (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧ -b^{1, 42}_0)
c  in CNF:
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_2
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_1
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_0
c  in DIMACS:
 1283  1284 -1285  41 -1286 0
 1283  1284 -1285  41 -1287 0
 1283  1284 -1285  41 -1288 0

c  0-1 --> -1
c    (-b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧ -p_41) -> ( b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0)
c  in CNF:
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨  b^{1, 42}_2
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_1
c     b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨  b^{1, 42}_0
c  in DIMACS:
 1283  1284  1285  41  1286 0
 1283  1284  1285  41 -1287 0
 1283  1284  1285  41  1288 0

c  -1-1 --> -2
c    ( b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧  b^{1, 41}_0 ∧ -p_41) -> ( b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0)
c  in CNF:
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨  b^{1, 42}_2
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨  b^{1, 42}_1
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨  p_41 ∨ -b^{1, 42}_0
c  in DIMACS:
-1283  1284 -1285  41  1286 0
-1283  1284 -1285  41  1287 0
-1283  1284 -1285  41 -1288 0

c  -2-1 --> break 
c    ( b^{1, 41}_2 ∧  b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧ -p_41) -> break
c  in CNF:
c    -b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨  b^{1, 41}_0 ∨  p_41 ∨ break
c  in DIMACS:
-1283 -1284  1285  41 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 41}_2 ∧ -b^{1, 41}_1 ∧ -b^{1, 41}_0 ∧ true) 
c  in CNF:
c    -b^{1, 41}_2 ∨  b^{1, 41}_1 ∨  b^{1, 41}_0 ∨ false 
c  in DIMACS:
-1283  1284  1285  0

c  3 does not represent an automaton state.
c    -(-b^{1, 41}_2 ∧  b^{1, 41}_1 ∧  b^{1, 41}_0 ∧ true) 
c  in CNF:
c     b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ false 
c  in DIMACS:
 1283 -1284 -1285  0
c  -3 does not represent an automaton state.
c    -( b^{1, 41}_2 ∧  b^{1, 41}_1 ∧  b^{1, 41}_0 ∧ true) 
c  in CNF:
c    -b^{1, 41}_2 ∨ -b^{1, 41}_1 ∨ -b^{1, 41}_0 ∨ false 
c  in DIMACS:
-1283 -1284 -1285  0

c i = 42
c  -2+1 --> -1
c    ( b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧  p_42) -> ( b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0)
c  in CNF:
c    -b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨  b^{1, 43}_2
c    -b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_1
c    -b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨  b^{1, 43}_0
c  in DIMACS:
-1286 -1287  1288 -42  1289 0
-1286 -1287  1288 -42 -1290 0
-1286 -1287  1288 -42  1291 0

c  -1+1 --> 0
c    ( b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0 ∧  p_42) -> (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧ -b^{1, 43}_0)
c  in CNF:
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_2
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_1
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_0
c  in DIMACS:
-1286  1287 -1288 -42 -1289 0
-1286  1287 -1288 -42 -1290 0
-1286  1287 -1288 -42 -1291 0

c  0+1 --> 1
c    (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧  p_42) -> (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0)
c  in CNF:
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_2
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_1
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨  b^{1, 43}_0
c  in DIMACS:
 1286  1287  1288 -42 -1289 0
 1286  1287  1288 -42 -1290 0
 1286  1287  1288 -42  1291 0

c  1+1 --> 2
c    (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0 ∧  p_42) -> (-b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0)
c  in CNF:
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_2
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨  b^{1, 43}_1
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ -p_42 ∨ -b^{1, 43}_0
c  in DIMACS:
 1286  1287 -1288 -42 -1289 0
 1286  1287 -1288 -42  1290 0
 1286  1287 -1288 -42 -1291 0

c  2+1 --> break 
c    (-b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧  p_42) -> break
c  in CNF:
c     b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 1286 -1287  1288 -42 1162 0


c  2-1 --> 1
c    (-b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧ -p_42) -> (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0)
c  in CNF:
c     b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_2
c     b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_1
c     b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨  b^{1, 43}_0
c  in DIMACS:
 1286 -1287  1288  42 -1289 0
 1286 -1287  1288  42 -1290 0
 1286 -1287  1288  42  1291 0

c  1-1 --> 0
c    (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0 ∧ -p_42) -> (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧ -b^{1, 43}_0)
c  in CNF:
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_2
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_1
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_0
c  in DIMACS:
 1286  1287 -1288  42 -1289 0
 1286  1287 -1288  42 -1290 0
 1286  1287 -1288  42 -1291 0

c  0-1 --> -1
c    (-b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧ -p_42) -> ( b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0)
c  in CNF:
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨  b^{1, 43}_2
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_1
c     b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨  b^{1, 43}_0
c  in DIMACS:
 1286  1287  1288  42  1289 0
 1286  1287  1288  42 -1290 0
 1286  1287  1288  42  1291 0

c  -1-1 --> -2
c    ( b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧  b^{1, 42}_0 ∧ -p_42) -> ( b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0)
c  in CNF:
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨  b^{1, 43}_2
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨  b^{1, 43}_1
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨  p_42 ∨ -b^{1, 43}_0
c  in DIMACS:
-1286  1287 -1288  42  1289 0
-1286  1287 -1288  42  1290 0
-1286  1287 -1288  42 -1291 0

c  -2-1 --> break 
c    ( b^{1, 42}_2 ∧  b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨  b^{1, 42}_0 ∨  p_42 ∨ break
c  in DIMACS:
-1286 -1287  1288  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 42}_2 ∧ -b^{1, 42}_1 ∧ -b^{1, 42}_0 ∧ true) 
c  in CNF:
c    -b^{1, 42}_2 ∨  b^{1, 42}_1 ∨  b^{1, 42}_0 ∨ false 
c  in DIMACS:
-1286  1287  1288  0

c  3 does not represent an automaton state.
c    -(-b^{1, 42}_2 ∧  b^{1, 42}_1 ∧  b^{1, 42}_0 ∧ true) 
c  in CNF:
c     b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ false 
c  in DIMACS:
 1286 -1287 -1288  0
c  -3 does not represent an automaton state.
c    -( b^{1, 42}_2 ∧  b^{1, 42}_1 ∧  b^{1, 42}_0 ∧ true) 
c  in CNF:
c    -b^{1, 42}_2 ∨ -b^{1, 42}_1 ∨ -b^{1, 42}_0 ∨ false 
c  in DIMACS:
-1286 -1287 -1288  0

c i = 43
c  -2+1 --> -1
c    ( b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧  p_43) -> ( b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0)
c  in CNF:
c    -b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨  b^{1, 44}_2
c    -b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_1
c    -b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨  b^{1, 44}_0
c  in DIMACS:
-1289 -1290  1291 -43  1292 0
-1289 -1290  1291 -43 -1293 0
-1289 -1290  1291 -43  1294 0

c  -1+1 --> 0
c    ( b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0 ∧  p_43) -> (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧ -b^{1, 44}_0)
c  in CNF:
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_2
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_1
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_0
c  in DIMACS:
-1289  1290 -1291 -43 -1292 0
-1289  1290 -1291 -43 -1293 0
-1289  1290 -1291 -43 -1294 0

c  0+1 --> 1
c    (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧  p_43) -> (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0)
c  in CNF:
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_2
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_1
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨  b^{1, 44}_0
c  in DIMACS:
 1289  1290  1291 -43 -1292 0
 1289  1290  1291 -43 -1293 0
 1289  1290  1291 -43  1294 0

c  1+1 --> 2
c    (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0 ∧  p_43) -> (-b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0)
c  in CNF:
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_2
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨  b^{1, 44}_1
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ -p_43 ∨ -b^{1, 44}_0
c  in DIMACS:
 1289  1290 -1291 -43 -1292 0
 1289  1290 -1291 -43  1293 0
 1289  1290 -1291 -43 -1294 0

c  2+1 --> break 
c    (-b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧  p_43) -> break
c  in CNF:
c     b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ -p_43 ∨ break
c  in DIMACS:
 1289 -1290  1291 -43 1162 0


c  2-1 --> 1
c    (-b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧ -p_43) -> (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0)
c  in CNF:
c     b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_2
c     b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_1
c     b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨  b^{1, 44}_0
c  in DIMACS:
 1289 -1290  1291  43 -1292 0
 1289 -1290  1291  43 -1293 0
 1289 -1290  1291  43  1294 0

c  1-1 --> 0
c    (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0 ∧ -p_43) -> (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧ -b^{1, 44}_0)
c  in CNF:
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_2
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_1
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_0
c  in DIMACS:
 1289  1290 -1291  43 -1292 0
 1289  1290 -1291  43 -1293 0
 1289  1290 -1291  43 -1294 0

c  0-1 --> -1
c    (-b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧ -p_43) -> ( b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0)
c  in CNF:
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨  b^{1, 44}_2
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_1
c     b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨  b^{1, 44}_0
c  in DIMACS:
 1289  1290  1291  43  1292 0
 1289  1290  1291  43 -1293 0
 1289  1290  1291  43  1294 0

c  -1-1 --> -2
c    ( b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧  b^{1, 43}_0 ∧ -p_43) -> ( b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0)
c  in CNF:
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨  b^{1, 44}_2
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨  b^{1, 44}_1
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨  p_43 ∨ -b^{1, 44}_0
c  in DIMACS:
-1289  1290 -1291  43  1292 0
-1289  1290 -1291  43  1293 0
-1289  1290 -1291  43 -1294 0

c  -2-1 --> break 
c    ( b^{1, 43}_2 ∧  b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧ -p_43) -> break
c  in CNF:
c    -b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨  b^{1, 43}_0 ∨  p_43 ∨ break
c  in DIMACS:
-1289 -1290  1291  43 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 43}_2 ∧ -b^{1, 43}_1 ∧ -b^{1, 43}_0 ∧ true) 
c  in CNF:
c    -b^{1, 43}_2 ∨  b^{1, 43}_1 ∨  b^{1, 43}_0 ∨ false 
c  in DIMACS:
-1289  1290  1291  0

c  3 does not represent an automaton state.
c    -(-b^{1, 43}_2 ∧  b^{1, 43}_1 ∧  b^{1, 43}_0 ∧ true) 
c  in CNF:
c     b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ false 
c  in DIMACS:
 1289 -1290 -1291  0
c  -3 does not represent an automaton state.
c    -( b^{1, 43}_2 ∧  b^{1, 43}_1 ∧  b^{1, 43}_0 ∧ true) 
c  in CNF:
c    -b^{1, 43}_2 ∨ -b^{1, 43}_1 ∨ -b^{1, 43}_0 ∨ false 
c  in DIMACS:
-1289 -1290 -1291  0

c i = 44
c  -2+1 --> -1
c    ( b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧  p_44) -> ( b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0)
c  in CNF:
c    -b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨  b^{1, 45}_2
c    -b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_1
c    -b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨  b^{1, 45}_0
c  in DIMACS:
-1292 -1293  1294 -44  1295 0
-1292 -1293  1294 -44 -1296 0
-1292 -1293  1294 -44  1297 0

c  -1+1 --> 0
c    ( b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0 ∧  p_44) -> (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧ -b^{1, 45}_0)
c  in CNF:
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_2
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_1
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_0
c  in DIMACS:
-1292  1293 -1294 -44 -1295 0
-1292  1293 -1294 -44 -1296 0
-1292  1293 -1294 -44 -1297 0

c  0+1 --> 1
c    (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧  p_44) -> (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0)
c  in CNF:
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_2
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_1
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨  b^{1, 45}_0
c  in DIMACS:
 1292  1293  1294 -44 -1295 0
 1292  1293  1294 -44 -1296 0
 1292  1293  1294 -44  1297 0

c  1+1 --> 2
c    (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0 ∧  p_44) -> (-b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0)
c  in CNF:
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_2
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨  b^{1, 45}_1
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ -p_44 ∨ -b^{1, 45}_0
c  in DIMACS:
 1292  1293 -1294 -44 -1295 0
 1292  1293 -1294 -44  1296 0
 1292  1293 -1294 -44 -1297 0

c  2+1 --> break 
c    (-b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧  p_44) -> break
c  in CNF:
c     b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 1292 -1293  1294 -44 1162 0


c  2-1 --> 1
c    (-b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧ -p_44) -> (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0)
c  in CNF:
c     b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_2
c     b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_1
c     b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨  b^{1, 45}_0
c  in DIMACS:
 1292 -1293  1294  44 -1295 0
 1292 -1293  1294  44 -1296 0
 1292 -1293  1294  44  1297 0

c  1-1 --> 0
c    (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0 ∧ -p_44) -> (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧ -b^{1, 45}_0)
c  in CNF:
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_2
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_1
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_0
c  in DIMACS:
 1292  1293 -1294  44 -1295 0
 1292  1293 -1294  44 -1296 0
 1292  1293 -1294  44 -1297 0

c  0-1 --> -1
c    (-b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧ -p_44) -> ( b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0)
c  in CNF:
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨  b^{1, 45}_2
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_1
c     b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨  b^{1, 45}_0
c  in DIMACS:
 1292  1293  1294  44  1295 0
 1292  1293  1294  44 -1296 0
 1292  1293  1294  44  1297 0

c  -1-1 --> -2
c    ( b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧  b^{1, 44}_0 ∧ -p_44) -> ( b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0)
c  in CNF:
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨  b^{1, 45}_2
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨  b^{1, 45}_1
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨  p_44 ∨ -b^{1, 45}_0
c  in DIMACS:
-1292  1293 -1294  44  1295 0
-1292  1293 -1294  44  1296 0
-1292  1293 -1294  44 -1297 0

c  -2-1 --> break 
c    ( b^{1, 44}_2 ∧  b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨  b^{1, 44}_0 ∨  p_44 ∨ break
c  in DIMACS:
-1292 -1293  1294  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 44}_2 ∧ -b^{1, 44}_1 ∧ -b^{1, 44}_0 ∧ true) 
c  in CNF:
c    -b^{1, 44}_2 ∨  b^{1, 44}_1 ∨  b^{1, 44}_0 ∨ false 
c  in DIMACS:
-1292  1293  1294  0

c  3 does not represent an automaton state.
c    -(-b^{1, 44}_2 ∧  b^{1, 44}_1 ∧  b^{1, 44}_0 ∧ true) 
c  in CNF:
c     b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ false 
c  in DIMACS:
 1292 -1293 -1294  0
c  -3 does not represent an automaton state.
c    -( b^{1, 44}_2 ∧  b^{1, 44}_1 ∧  b^{1, 44}_0 ∧ true) 
c  in CNF:
c    -b^{1, 44}_2 ∨ -b^{1, 44}_1 ∨ -b^{1, 44}_0 ∨ false 
c  in DIMACS:
-1292 -1293 -1294  0

c i = 45
c  -2+1 --> -1
c    ( b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧  p_45) -> ( b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0)
c  in CNF:
c    -b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨  b^{1, 46}_2
c    -b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_1
c    -b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨  b^{1, 46}_0
c  in DIMACS:
-1295 -1296  1297 -45  1298 0
-1295 -1296  1297 -45 -1299 0
-1295 -1296  1297 -45  1300 0

c  -1+1 --> 0
c    ( b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0 ∧  p_45) -> (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧ -b^{1, 46}_0)
c  in CNF:
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_2
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_1
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_0
c  in DIMACS:
-1295  1296 -1297 -45 -1298 0
-1295  1296 -1297 -45 -1299 0
-1295  1296 -1297 -45 -1300 0

c  0+1 --> 1
c    (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧  p_45) -> (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0)
c  in CNF:
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_2
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_1
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨  b^{1, 46}_0
c  in DIMACS:
 1295  1296  1297 -45 -1298 0
 1295  1296  1297 -45 -1299 0
 1295  1296  1297 -45  1300 0

c  1+1 --> 2
c    (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0 ∧  p_45) -> (-b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0)
c  in CNF:
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_2
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨  b^{1, 46}_1
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ -p_45 ∨ -b^{1, 46}_0
c  in DIMACS:
 1295  1296 -1297 -45 -1298 0
 1295  1296 -1297 -45  1299 0
 1295  1296 -1297 -45 -1300 0

c  2+1 --> break 
c    (-b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧  p_45) -> break
c  in CNF:
c     b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 1295 -1296  1297 -45 1162 0


c  2-1 --> 1
c    (-b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧ -p_45) -> (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0)
c  in CNF:
c     b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_2
c     b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_1
c     b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨  b^{1, 46}_0
c  in DIMACS:
 1295 -1296  1297  45 -1298 0
 1295 -1296  1297  45 -1299 0
 1295 -1296  1297  45  1300 0

c  1-1 --> 0
c    (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0 ∧ -p_45) -> (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧ -b^{1, 46}_0)
c  in CNF:
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_2
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_1
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_0
c  in DIMACS:
 1295  1296 -1297  45 -1298 0
 1295  1296 -1297  45 -1299 0
 1295  1296 -1297  45 -1300 0

c  0-1 --> -1
c    (-b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧ -p_45) -> ( b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0)
c  in CNF:
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨  b^{1, 46}_2
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_1
c     b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨  b^{1, 46}_0
c  in DIMACS:
 1295  1296  1297  45  1298 0
 1295  1296  1297  45 -1299 0
 1295  1296  1297  45  1300 0

c  -1-1 --> -2
c    ( b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧  b^{1, 45}_0 ∧ -p_45) -> ( b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0)
c  in CNF:
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨  b^{1, 46}_2
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨  b^{1, 46}_1
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨  p_45 ∨ -b^{1, 46}_0
c  in DIMACS:
-1295  1296 -1297  45  1298 0
-1295  1296 -1297  45  1299 0
-1295  1296 -1297  45 -1300 0

c  -2-1 --> break 
c    ( b^{1, 45}_2 ∧  b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨  b^{1, 45}_0 ∨  p_45 ∨ break
c  in DIMACS:
-1295 -1296  1297  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 45}_2 ∧ -b^{1, 45}_1 ∧ -b^{1, 45}_0 ∧ true) 
c  in CNF:
c    -b^{1, 45}_2 ∨  b^{1, 45}_1 ∨  b^{1, 45}_0 ∨ false 
c  in DIMACS:
-1295  1296  1297  0

c  3 does not represent an automaton state.
c    -(-b^{1, 45}_2 ∧  b^{1, 45}_1 ∧  b^{1, 45}_0 ∧ true) 
c  in CNF:
c     b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ false 
c  in DIMACS:
 1295 -1296 -1297  0
c  -3 does not represent an automaton state.
c    -( b^{1, 45}_2 ∧  b^{1, 45}_1 ∧  b^{1, 45}_0 ∧ true) 
c  in CNF:
c    -b^{1, 45}_2 ∨ -b^{1, 45}_1 ∨ -b^{1, 45}_0 ∨ false 
c  in DIMACS:
-1295 -1296 -1297  0

c i = 46
c  -2+1 --> -1
c    ( b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧  p_46) -> ( b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0)
c  in CNF:
c    -b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨  b^{1, 47}_2
c    -b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_1
c    -b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨  b^{1, 47}_0
c  in DIMACS:
-1298 -1299  1300 -46  1301 0
-1298 -1299  1300 -46 -1302 0
-1298 -1299  1300 -46  1303 0

c  -1+1 --> 0
c    ( b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0 ∧  p_46) -> (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧ -b^{1, 47}_0)
c  in CNF:
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_2
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_1
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_0
c  in DIMACS:
-1298  1299 -1300 -46 -1301 0
-1298  1299 -1300 -46 -1302 0
-1298  1299 -1300 -46 -1303 0

c  0+1 --> 1
c    (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧  p_46) -> (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0)
c  in CNF:
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_2
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_1
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨  b^{1, 47}_0
c  in DIMACS:
 1298  1299  1300 -46 -1301 0
 1298  1299  1300 -46 -1302 0
 1298  1299  1300 -46  1303 0

c  1+1 --> 2
c    (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0 ∧  p_46) -> (-b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0)
c  in CNF:
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_2
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨  b^{1, 47}_1
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ -p_46 ∨ -b^{1, 47}_0
c  in DIMACS:
 1298  1299 -1300 -46 -1301 0
 1298  1299 -1300 -46  1302 0
 1298  1299 -1300 -46 -1303 0

c  2+1 --> break 
c    (-b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧  p_46) -> break
c  in CNF:
c     b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ -p_46 ∨ break
c  in DIMACS:
 1298 -1299  1300 -46 1162 0


c  2-1 --> 1
c    (-b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧ -p_46) -> (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0)
c  in CNF:
c     b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_2
c     b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_1
c     b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨  b^{1, 47}_0
c  in DIMACS:
 1298 -1299  1300  46 -1301 0
 1298 -1299  1300  46 -1302 0
 1298 -1299  1300  46  1303 0

c  1-1 --> 0
c    (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0 ∧ -p_46) -> (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧ -b^{1, 47}_0)
c  in CNF:
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_2
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_1
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_0
c  in DIMACS:
 1298  1299 -1300  46 -1301 0
 1298  1299 -1300  46 -1302 0
 1298  1299 -1300  46 -1303 0

c  0-1 --> -1
c    (-b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧ -p_46) -> ( b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0)
c  in CNF:
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨  b^{1, 47}_2
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_1
c     b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨  b^{1, 47}_0
c  in DIMACS:
 1298  1299  1300  46  1301 0
 1298  1299  1300  46 -1302 0
 1298  1299  1300  46  1303 0

c  -1-1 --> -2
c    ( b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧  b^{1, 46}_0 ∧ -p_46) -> ( b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0)
c  in CNF:
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨  b^{1, 47}_2
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨  b^{1, 47}_1
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨  p_46 ∨ -b^{1, 47}_0
c  in DIMACS:
-1298  1299 -1300  46  1301 0
-1298  1299 -1300  46  1302 0
-1298  1299 -1300  46 -1303 0

c  -2-1 --> break 
c    ( b^{1, 46}_2 ∧  b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧ -p_46) -> break
c  in CNF:
c    -b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨  b^{1, 46}_0 ∨  p_46 ∨ break
c  in DIMACS:
-1298 -1299  1300  46 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 46}_2 ∧ -b^{1, 46}_1 ∧ -b^{1, 46}_0 ∧ true) 
c  in CNF:
c    -b^{1, 46}_2 ∨  b^{1, 46}_1 ∨  b^{1, 46}_0 ∨ false 
c  in DIMACS:
-1298  1299  1300  0

c  3 does not represent an automaton state.
c    -(-b^{1, 46}_2 ∧  b^{1, 46}_1 ∧  b^{1, 46}_0 ∧ true) 
c  in CNF:
c     b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ false 
c  in DIMACS:
 1298 -1299 -1300  0
c  -3 does not represent an automaton state.
c    -( b^{1, 46}_2 ∧  b^{1, 46}_1 ∧  b^{1, 46}_0 ∧ true) 
c  in CNF:
c    -b^{1, 46}_2 ∨ -b^{1, 46}_1 ∨ -b^{1, 46}_0 ∨ false 
c  in DIMACS:
-1298 -1299 -1300  0

c i = 47
c  -2+1 --> -1
c    ( b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧  p_47) -> ( b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0)
c  in CNF:
c    -b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨  b^{1, 48}_2
c    -b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_1
c    -b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨  b^{1, 48}_0
c  in DIMACS:
-1301 -1302  1303 -47  1304 0
-1301 -1302  1303 -47 -1305 0
-1301 -1302  1303 -47  1306 0

c  -1+1 --> 0
c    ( b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0 ∧  p_47) -> (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧ -b^{1, 48}_0)
c  in CNF:
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_2
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_1
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_0
c  in DIMACS:
-1301  1302 -1303 -47 -1304 0
-1301  1302 -1303 -47 -1305 0
-1301  1302 -1303 -47 -1306 0

c  0+1 --> 1
c    (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧  p_47) -> (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0)
c  in CNF:
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_2
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_1
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨  b^{1, 48}_0
c  in DIMACS:
 1301  1302  1303 -47 -1304 0
 1301  1302  1303 -47 -1305 0
 1301  1302  1303 -47  1306 0

c  1+1 --> 2
c    (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0 ∧  p_47) -> (-b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0)
c  in CNF:
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_2
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨  b^{1, 48}_1
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ -p_47 ∨ -b^{1, 48}_0
c  in DIMACS:
 1301  1302 -1303 -47 -1304 0
 1301  1302 -1303 -47  1305 0
 1301  1302 -1303 -47 -1306 0

c  2+1 --> break 
c    (-b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧  p_47) -> break
c  in CNF:
c     b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ -p_47 ∨ break
c  in DIMACS:
 1301 -1302  1303 -47 1162 0


c  2-1 --> 1
c    (-b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧ -p_47) -> (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0)
c  in CNF:
c     b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_2
c     b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_1
c     b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨  b^{1, 48}_0
c  in DIMACS:
 1301 -1302  1303  47 -1304 0
 1301 -1302  1303  47 -1305 0
 1301 -1302  1303  47  1306 0

c  1-1 --> 0
c    (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0 ∧ -p_47) -> (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧ -b^{1, 48}_0)
c  in CNF:
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_2
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_1
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_0
c  in DIMACS:
 1301  1302 -1303  47 -1304 0
 1301  1302 -1303  47 -1305 0
 1301  1302 -1303  47 -1306 0

c  0-1 --> -1
c    (-b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧ -p_47) -> ( b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0)
c  in CNF:
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨  b^{1, 48}_2
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_1
c     b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨  b^{1, 48}_0
c  in DIMACS:
 1301  1302  1303  47  1304 0
 1301  1302  1303  47 -1305 0
 1301  1302  1303  47  1306 0

c  -1-1 --> -2
c    ( b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧  b^{1, 47}_0 ∧ -p_47) -> ( b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0)
c  in CNF:
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨  b^{1, 48}_2
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨  b^{1, 48}_1
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨  p_47 ∨ -b^{1, 48}_0
c  in DIMACS:
-1301  1302 -1303  47  1304 0
-1301  1302 -1303  47  1305 0
-1301  1302 -1303  47 -1306 0

c  -2-1 --> break 
c    ( b^{1, 47}_2 ∧  b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧ -p_47) -> break
c  in CNF:
c    -b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨  b^{1, 47}_0 ∨  p_47 ∨ break
c  in DIMACS:
-1301 -1302  1303  47 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 47}_2 ∧ -b^{1, 47}_1 ∧ -b^{1, 47}_0 ∧ true) 
c  in CNF:
c    -b^{1, 47}_2 ∨  b^{1, 47}_1 ∨  b^{1, 47}_0 ∨ false 
c  in DIMACS:
-1301  1302  1303  0

c  3 does not represent an automaton state.
c    -(-b^{1, 47}_2 ∧  b^{1, 47}_1 ∧  b^{1, 47}_0 ∧ true) 
c  in CNF:
c     b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ false 
c  in DIMACS:
 1301 -1302 -1303  0
c  -3 does not represent an automaton state.
c    -( b^{1, 47}_2 ∧  b^{1, 47}_1 ∧  b^{1, 47}_0 ∧ true) 
c  in CNF:
c    -b^{1, 47}_2 ∨ -b^{1, 47}_1 ∨ -b^{1, 47}_0 ∨ false 
c  in DIMACS:
-1301 -1302 -1303  0

c i = 48
c  -2+1 --> -1
c    ( b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧  p_48) -> ( b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0)
c  in CNF:
c    -b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨  b^{1, 49}_2
c    -b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_1
c    -b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨  b^{1, 49}_0
c  in DIMACS:
-1304 -1305  1306 -48  1307 0
-1304 -1305  1306 -48 -1308 0
-1304 -1305  1306 -48  1309 0

c  -1+1 --> 0
c    ( b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0 ∧  p_48) -> (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧ -b^{1, 49}_0)
c  in CNF:
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_2
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_1
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_0
c  in DIMACS:
-1304  1305 -1306 -48 -1307 0
-1304  1305 -1306 -48 -1308 0
-1304  1305 -1306 -48 -1309 0

c  0+1 --> 1
c    (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧  p_48) -> (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0)
c  in CNF:
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_2
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_1
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨  b^{1, 49}_0
c  in DIMACS:
 1304  1305  1306 -48 -1307 0
 1304  1305  1306 -48 -1308 0
 1304  1305  1306 -48  1309 0

c  1+1 --> 2
c    (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0 ∧  p_48) -> (-b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0)
c  in CNF:
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_2
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨  b^{1, 49}_1
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ -p_48 ∨ -b^{1, 49}_0
c  in DIMACS:
 1304  1305 -1306 -48 -1307 0
 1304  1305 -1306 -48  1308 0
 1304  1305 -1306 -48 -1309 0

c  2+1 --> break 
c    (-b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧  p_48) -> break
c  in CNF:
c     b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 1304 -1305  1306 -48 1162 0


c  2-1 --> 1
c    (-b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧ -p_48) -> (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0)
c  in CNF:
c     b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_2
c     b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_1
c     b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨  b^{1, 49}_0
c  in DIMACS:
 1304 -1305  1306  48 -1307 0
 1304 -1305  1306  48 -1308 0
 1304 -1305  1306  48  1309 0

c  1-1 --> 0
c    (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0 ∧ -p_48) -> (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧ -b^{1, 49}_0)
c  in CNF:
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_2
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_1
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_0
c  in DIMACS:
 1304  1305 -1306  48 -1307 0
 1304  1305 -1306  48 -1308 0
 1304  1305 -1306  48 -1309 0

c  0-1 --> -1
c    (-b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧ -p_48) -> ( b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0)
c  in CNF:
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨  b^{1, 49}_2
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_1
c     b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨  b^{1, 49}_0
c  in DIMACS:
 1304  1305  1306  48  1307 0
 1304  1305  1306  48 -1308 0
 1304  1305  1306  48  1309 0

c  -1-1 --> -2
c    ( b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧  b^{1, 48}_0 ∧ -p_48) -> ( b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0)
c  in CNF:
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨  b^{1, 49}_2
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨  b^{1, 49}_1
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨  p_48 ∨ -b^{1, 49}_0
c  in DIMACS:
-1304  1305 -1306  48  1307 0
-1304  1305 -1306  48  1308 0
-1304  1305 -1306  48 -1309 0

c  -2-1 --> break 
c    ( b^{1, 48}_2 ∧  b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨  b^{1, 48}_0 ∨  p_48 ∨ break
c  in DIMACS:
-1304 -1305  1306  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 48}_2 ∧ -b^{1, 48}_1 ∧ -b^{1, 48}_0 ∧ true) 
c  in CNF:
c    -b^{1, 48}_2 ∨  b^{1, 48}_1 ∨  b^{1, 48}_0 ∨ false 
c  in DIMACS:
-1304  1305  1306  0

c  3 does not represent an automaton state.
c    -(-b^{1, 48}_2 ∧  b^{1, 48}_1 ∧  b^{1, 48}_0 ∧ true) 
c  in CNF:
c     b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ false 
c  in DIMACS:
 1304 -1305 -1306  0
c  -3 does not represent an automaton state.
c    -( b^{1, 48}_2 ∧  b^{1, 48}_1 ∧  b^{1, 48}_0 ∧ true) 
c  in CNF:
c    -b^{1, 48}_2 ∨ -b^{1, 48}_1 ∨ -b^{1, 48}_0 ∨ false 
c  in DIMACS:
-1304 -1305 -1306  0

c i = 49
c  -2+1 --> -1
c    ( b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧  p_49) -> ( b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0)
c  in CNF:
c    -b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨  b^{1, 50}_2
c    -b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_1
c    -b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨  b^{1, 50}_0
c  in DIMACS:
-1307 -1308  1309 -49  1310 0
-1307 -1308  1309 -49 -1311 0
-1307 -1308  1309 -49  1312 0

c  -1+1 --> 0
c    ( b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0 ∧  p_49) -> (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧ -b^{1, 50}_0)
c  in CNF:
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_2
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_1
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_0
c  in DIMACS:
-1307  1308 -1309 -49 -1310 0
-1307  1308 -1309 -49 -1311 0
-1307  1308 -1309 -49 -1312 0

c  0+1 --> 1
c    (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧  p_49) -> (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0)
c  in CNF:
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_2
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_1
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨  b^{1, 50}_0
c  in DIMACS:
 1307  1308  1309 -49 -1310 0
 1307  1308  1309 -49 -1311 0
 1307  1308  1309 -49  1312 0

c  1+1 --> 2
c    (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0 ∧  p_49) -> (-b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0)
c  in CNF:
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_2
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨  b^{1, 50}_1
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ -p_49 ∨ -b^{1, 50}_0
c  in DIMACS:
 1307  1308 -1309 -49 -1310 0
 1307  1308 -1309 -49  1311 0
 1307  1308 -1309 -49 -1312 0

c  2+1 --> break 
c    (-b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧  p_49) -> break
c  in CNF:
c     b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ -p_49 ∨ break
c  in DIMACS:
 1307 -1308  1309 -49 1162 0


c  2-1 --> 1
c    (-b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧ -p_49) -> (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0)
c  in CNF:
c     b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_2
c     b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_1
c     b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨  b^{1, 50}_0
c  in DIMACS:
 1307 -1308  1309  49 -1310 0
 1307 -1308  1309  49 -1311 0
 1307 -1308  1309  49  1312 0

c  1-1 --> 0
c    (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0 ∧ -p_49) -> (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧ -b^{1, 50}_0)
c  in CNF:
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_2
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_1
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_0
c  in DIMACS:
 1307  1308 -1309  49 -1310 0
 1307  1308 -1309  49 -1311 0
 1307  1308 -1309  49 -1312 0

c  0-1 --> -1
c    (-b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧ -p_49) -> ( b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0)
c  in CNF:
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨  b^{1, 50}_2
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_1
c     b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨  b^{1, 50}_0
c  in DIMACS:
 1307  1308  1309  49  1310 0
 1307  1308  1309  49 -1311 0
 1307  1308  1309  49  1312 0

c  -1-1 --> -2
c    ( b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧  b^{1, 49}_0 ∧ -p_49) -> ( b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0)
c  in CNF:
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨  b^{1, 50}_2
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨  b^{1, 50}_1
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨  p_49 ∨ -b^{1, 50}_0
c  in DIMACS:
-1307  1308 -1309  49  1310 0
-1307  1308 -1309  49  1311 0
-1307  1308 -1309  49 -1312 0

c  -2-1 --> break 
c    ( b^{1, 49}_2 ∧  b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧ -p_49) -> break
c  in CNF:
c    -b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨  b^{1, 49}_0 ∨  p_49 ∨ break
c  in DIMACS:
-1307 -1308  1309  49 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 49}_2 ∧ -b^{1, 49}_1 ∧ -b^{1, 49}_0 ∧ true) 
c  in CNF:
c    -b^{1, 49}_2 ∨  b^{1, 49}_1 ∨  b^{1, 49}_0 ∨ false 
c  in DIMACS:
-1307  1308  1309  0

c  3 does not represent an automaton state.
c    -(-b^{1, 49}_2 ∧  b^{1, 49}_1 ∧  b^{1, 49}_0 ∧ true) 
c  in CNF:
c     b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ false 
c  in DIMACS:
 1307 -1308 -1309  0
c  -3 does not represent an automaton state.
c    -( b^{1, 49}_2 ∧  b^{1, 49}_1 ∧  b^{1, 49}_0 ∧ true) 
c  in CNF:
c    -b^{1, 49}_2 ∨ -b^{1, 49}_1 ∨ -b^{1, 49}_0 ∨ false 
c  in DIMACS:
-1307 -1308 -1309  0

c i = 50
c  -2+1 --> -1
c    ( b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧  p_50) -> ( b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0)
c  in CNF:
c    -b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨  b^{1, 51}_2
c    -b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_1
c    -b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨  b^{1, 51}_0
c  in DIMACS:
-1310 -1311  1312 -50  1313 0
-1310 -1311  1312 -50 -1314 0
-1310 -1311  1312 -50  1315 0

c  -1+1 --> 0
c    ( b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0 ∧  p_50) -> (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧ -b^{1, 51}_0)
c  in CNF:
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_2
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_1
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_0
c  in DIMACS:
-1310  1311 -1312 -50 -1313 0
-1310  1311 -1312 -50 -1314 0
-1310  1311 -1312 -50 -1315 0

c  0+1 --> 1
c    (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧  p_50) -> (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0)
c  in CNF:
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_2
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_1
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨  b^{1, 51}_0
c  in DIMACS:
 1310  1311  1312 -50 -1313 0
 1310  1311  1312 -50 -1314 0
 1310  1311  1312 -50  1315 0

c  1+1 --> 2
c    (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0 ∧  p_50) -> (-b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0)
c  in CNF:
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_2
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨  b^{1, 51}_1
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ -p_50 ∨ -b^{1, 51}_0
c  in DIMACS:
 1310  1311 -1312 -50 -1313 0
 1310  1311 -1312 -50  1314 0
 1310  1311 -1312 -50 -1315 0

c  2+1 --> break 
c    (-b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧  p_50) -> break
c  in CNF:
c     b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 1310 -1311  1312 -50 1162 0


c  2-1 --> 1
c    (-b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧ -p_50) -> (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0)
c  in CNF:
c     b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_2
c     b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_1
c     b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨  b^{1, 51}_0
c  in DIMACS:
 1310 -1311  1312  50 -1313 0
 1310 -1311  1312  50 -1314 0
 1310 -1311  1312  50  1315 0

c  1-1 --> 0
c    (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0 ∧ -p_50) -> (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧ -b^{1, 51}_0)
c  in CNF:
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_2
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_1
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_0
c  in DIMACS:
 1310  1311 -1312  50 -1313 0
 1310  1311 -1312  50 -1314 0
 1310  1311 -1312  50 -1315 0

c  0-1 --> -1
c    (-b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧ -p_50) -> ( b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0)
c  in CNF:
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨  b^{1, 51}_2
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_1
c     b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨  b^{1, 51}_0
c  in DIMACS:
 1310  1311  1312  50  1313 0
 1310  1311  1312  50 -1314 0
 1310  1311  1312  50  1315 0

c  -1-1 --> -2
c    ( b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧  b^{1, 50}_0 ∧ -p_50) -> ( b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0)
c  in CNF:
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨  b^{1, 51}_2
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨  b^{1, 51}_1
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨  p_50 ∨ -b^{1, 51}_0
c  in DIMACS:
-1310  1311 -1312  50  1313 0
-1310  1311 -1312  50  1314 0
-1310  1311 -1312  50 -1315 0

c  -2-1 --> break 
c    ( b^{1, 50}_2 ∧  b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨  b^{1, 50}_0 ∨  p_50 ∨ break
c  in DIMACS:
-1310 -1311  1312  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 50}_2 ∧ -b^{1, 50}_1 ∧ -b^{1, 50}_0 ∧ true) 
c  in CNF:
c    -b^{1, 50}_2 ∨  b^{1, 50}_1 ∨  b^{1, 50}_0 ∨ false 
c  in DIMACS:
-1310  1311  1312  0

c  3 does not represent an automaton state.
c    -(-b^{1, 50}_2 ∧  b^{1, 50}_1 ∧  b^{1, 50}_0 ∧ true) 
c  in CNF:
c     b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ false 
c  in DIMACS:
 1310 -1311 -1312  0
c  -3 does not represent an automaton state.
c    -( b^{1, 50}_2 ∧  b^{1, 50}_1 ∧  b^{1, 50}_0 ∧ true) 
c  in CNF:
c    -b^{1, 50}_2 ∨ -b^{1, 50}_1 ∨ -b^{1, 50}_0 ∨ false 
c  in DIMACS:
-1310 -1311 -1312  0

c i = 51
c  -2+1 --> -1
c    ( b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧  p_51) -> ( b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0)
c  in CNF:
c    -b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨  b^{1, 52}_2
c    -b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_1
c    -b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨  b^{1, 52}_0
c  in DIMACS:
-1313 -1314  1315 -51  1316 0
-1313 -1314  1315 -51 -1317 0
-1313 -1314  1315 -51  1318 0

c  -1+1 --> 0
c    ( b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0 ∧  p_51) -> (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧ -b^{1, 52}_0)
c  in CNF:
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_2
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_1
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_0
c  in DIMACS:
-1313  1314 -1315 -51 -1316 0
-1313  1314 -1315 -51 -1317 0
-1313  1314 -1315 -51 -1318 0

c  0+1 --> 1
c    (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧  p_51) -> (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0)
c  in CNF:
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_2
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_1
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨  b^{1, 52}_0
c  in DIMACS:
 1313  1314  1315 -51 -1316 0
 1313  1314  1315 -51 -1317 0
 1313  1314  1315 -51  1318 0

c  1+1 --> 2
c    (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0 ∧  p_51) -> (-b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0)
c  in CNF:
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_2
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨  b^{1, 52}_1
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ -p_51 ∨ -b^{1, 52}_0
c  in DIMACS:
 1313  1314 -1315 -51 -1316 0
 1313  1314 -1315 -51  1317 0
 1313  1314 -1315 -51 -1318 0

c  2+1 --> break 
c    (-b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧  p_51) -> break
c  in CNF:
c     b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ -p_51 ∨ break
c  in DIMACS:
 1313 -1314  1315 -51 1162 0


c  2-1 --> 1
c    (-b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧ -p_51) -> (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0)
c  in CNF:
c     b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_2
c     b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_1
c     b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨  b^{1, 52}_0
c  in DIMACS:
 1313 -1314  1315  51 -1316 0
 1313 -1314  1315  51 -1317 0
 1313 -1314  1315  51  1318 0

c  1-1 --> 0
c    (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0 ∧ -p_51) -> (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧ -b^{1, 52}_0)
c  in CNF:
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_2
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_1
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_0
c  in DIMACS:
 1313  1314 -1315  51 -1316 0
 1313  1314 -1315  51 -1317 0
 1313  1314 -1315  51 -1318 0

c  0-1 --> -1
c    (-b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧ -p_51) -> ( b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0)
c  in CNF:
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨  b^{1, 52}_2
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_1
c     b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨  b^{1, 52}_0
c  in DIMACS:
 1313  1314  1315  51  1316 0
 1313  1314  1315  51 -1317 0
 1313  1314  1315  51  1318 0

c  -1-1 --> -2
c    ( b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧  b^{1, 51}_0 ∧ -p_51) -> ( b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0)
c  in CNF:
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨  b^{1, 52}_2
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨  b^{1, 52}_1
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨  p_51 ∨ -b^{1, 52}_0
c  in DIMACS:
-1313  1314 -1315  51  1316 0
-1313  1314 -1315  51  1317 0
-1313  1314 -1315  51 -1318 0

c  -2-1 --> break 
c    ( b^{1, 51}_2 ∧  b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧ -p_51) -> break
c  in CNF:
c    -b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨  b^{1, 51}_0 ∨  p_51 ∨ break
c  in DIMACS:
-1313 -1314  1315  51 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 51}_2 ∧ -b^{1, 51}_1 ∧ -b^{1, 51}_0 ∧ true) 
c  in CNF:
c    -b^{1, 51}_2 ∨  b^{1, 51}_1 ∨  b^{1, 51}_0 ∨ false 
c  in DIMACS:
-1313  1314  1315  0

c  3 does not represent an automaton state.
c    -(-b^{1, 51}_2 ∧  b^{1, 51}_1 ∧  b^{1, 51}_0 ∧ true) 
c  in CNF:
c     b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ false 
c  in DIMACS:
 1313 -1314 -1315  0
c  -3 does not represent an automaton state.
c    -( b^{1, 51}_2 ∧  b^{1, 51}_1 ∧  b^{1, 51}_0 ∧ true) 
c  in CNF:
c    -b^{1, 51}_2 ∨ -b^{1, 51}_1 ∨ -b^{1, 51}_0 ∨ false 
c  in DIMACS:
-1313 -1314 -1315  0

c i = 52
c  -2+1 --> -1
c    ( b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧  p_52) -> ( b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0)
c  in CNF:
c    -b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨  b^{1, 53}_2
c    -b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_1
c    -b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨  b^{1, 53}_0
c  in DIMACS:
-1316 -1317  1318 -52  1319 0
-1316 -1317  1318 -52 -1320 0
-1316 -1317  1318 -52  1321 0

c  -1+1 --> 0
c    ( b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0 ∧  p_52) -> (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧ -b^{1, 53}_0)
c  in CNF:
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_2
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_1
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_0
c  in DIMACS:
-1316  1317 -1318 -52 -1319 0
-1316  1317 -1318 -52 -1320 0
-1316  1317 -1318 -52 -1321 0

c  0+1 --> 1
c    (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧  p_52) -> (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0)
c  in CNF:
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_2
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_1
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨  b^{1, 53}_0
c  in DIMACS:
 1316  1317  1318 -52 -1319 0
 1316  1317  1318 -52 -1320 0
 1316  1317  1318 -52  1321 0

c  1+1 --> 2
c    (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0 ∧  p_52) -> (-b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0)
c  in CNF:
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_2
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨  b^{1, 53}_1
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ -p_52 ∨ -b^{1, 53}_0
c  in DIMACS:
 1316  1317 -1318 -52 -1319 0
 1316  1317 -1318 -52  1320 0
 1316  1317 -1318 -52 -1321 0

c  2+1 --> break 
c    (-b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧  p_52) -> break
c  in CNF:
c     b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 1316 -1317  1318 -52 1162 0


c  2-1 --> 1
c    (-b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧ -p_52) -> (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0)
c  in CNF:
c     b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_2
c     b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_1
c     b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨  b^{1, 53}_0
c  in DIMACS:
 1316 -1317  1318  52 -1319 0
 1316 -1317  1318  52 -1320 0
 1316 -1317  1318  52  1321 0

c  1-1 --> 0
c    (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0 ∧ -p_52) -> (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧ -b^{1, 53}_0)
c  in CNF:
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_2
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_1
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_0
c  in DIMACS:
 1316  1317 -1318  52 -1319 0
 1316  1317 -1318  52 -1320 0
 1316  1317 -1318  52 -1321 0

c  0-1 --> -1
c    (-b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧ -p_52) -> ( b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0)
c  in CNF:
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨  b^{1, 53}_2
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_1
c     b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨  b^{1, 53}_0
c  in DIMACS:
 1316  1317  1318  52  1319 0
 1316  1317  1318  52 -1320 0
 1316  1317  1318  52  1321 0

c  -1-1 --> -2
c    ( b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧  b^{1, 52}_0 ∧ -p_52) -> ( b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0)
c  in CNF:
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨  b^{1, 53}_2
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨  b^{1, 53}_1
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨  p_52 ∨ -b^{1, 53}_0
c  in DIMACS:
-1316  1317 -1318  52  1319 0
-1316  1317 -1318  52  1320 0
-1316  1317 -1318  52 -1321 0

c  -2-1 --> break 
c    ( b^{1, 52}_2 ∧  b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨  b^{1, 52}_0 ∨  p_52 ∨ break
c  in DIMACS:
-1316 -1317  1318  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 52}_2 ∧ -b^{1, 52}_1 ∧ -b^{1, 52}_0 ∧ true) 
c  in CNF:
c    -b^{1, 52}_2 ∨  b^{1, 52}_1 ∨  b^{1, 52}_0 ∨ false 
c  in DIMACS:
-1316  1317  1318  0

c  3 does not represent an automaton state.
c    -(-b^{1, 52}_2 ∧  b^{1, 52}_1 ∧  b^{1, 52}_0 ∧ true) 
c  in CNF:
c     b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ false 
c  in DIMACS:
 1316 -1317 -1318  0
c  -3 does not represent an automaton state.
c    -( b^{1, 52}_2 ∧  b^{1, 52}_1 ∧  b^{1, 52}_0 ∧ true) 
c  in CNF:
c    -b^{1, 52}_2 ∨ -b^{1, 52}_1 ∨ -b^{1, 52}_0 ∨ false 
c  in DIMACS:
-1316 -1317 -1318  0

c i = 53
c  -2+1 --> -1
c    ( b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧  p_53) -> ( b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0)
c  in CNF:
c    -b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨  b^{1, 54}_2
c    -b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_1
c    -b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨  b^{1, 54}_0
c  in DIMACS:
-1319 -1320  1321 -53  1322 0
-1319 -1320  1321 -53 -1323 0
-1319 -1320  1321 -53  1324 0

c  -1+1 --> 0
c    ( b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0 ∧  p_53) -> (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧ -b^{1, 54}_0)
c  in CNF:
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_2
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_1
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_0
c  in DIMACS:
-1319  1320 -1321 -53 -1322 0
-1319  1320 -1321 -53 -1323 0
-1319  1320 -1321 -53 -1324 0

c  0+1 --> 1
c    (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧  p_53) -> (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0)
c  in CNF:
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_2
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_1
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨  b^{1, 54}_0
c  in DIMACS:
 1319  1320  1321 -53 -1322 0
 1319  1320  1321 -53 -1323 0
 1319  1320  1321 -53  1324 0

c  1+1 --> 2
c    (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0 ∧  p_53) -> (-b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0)
c  in CNF:
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_2
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨  b^{1, 54}_1
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ -p_53 ∨ -b^{1, 54}_0
c  in DIMACS:
 1319  1320 -1321 -53 -1322 0
 1319  1320 -1321 -53  1323 0
 1319  1320 -1321 -53 -1324 0

c  2+1 --> break 
c    (-b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧  p_53) -> break
c  in CNF:
c     b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ -p_53 ∨ break
c  in DIMACS:
 1319 -1320  1321 -53 1162 0


c  2-1 --> 1
c    (-b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧ -p_53) -> (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0)
c  in CNF:
c     b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_2
c     b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_1
c     b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨  b^{1, 54}_0
c  in DIMACS:
 1319 -1320  1321  53 -1322 0
 1319 -1320  1321  53 -1323 0
 1319 -1320  1321  53  1324 0

c  1-1 --> 0
c    (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0 ∧ -p_53) -> (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧ -b^{1, 54}_0)
c  in CNF:
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_2
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_1
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_0
c  in DIMACS:
 1319  1320 -1321  53 -1322 0
 1319  1320 -1321  53 -1323 0
 1319  1320 -1321  53 -1324 0

c  0-1 --> -1
c    (-b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧ -p_53) -> ( b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0)
c  in CNF:
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨  b^{1, 54}_2
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_1
c     b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨  b^{1, 54}_0
c  in DIMACS:
 1319  1320  1321  53  1322 0
 1319  1320  1321  53 -1323 0
 1319  1320  1321  53  1324 0

c  -1-1 --> -2
c    ( b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧  b^{1, 53}_0 ∧ -p_53) -> ( b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0)
c  in CNF:
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨  b^{1, 54}_2
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨  b^{1, 54}_1
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨  p_53 ∨ -b^{1, 54}_0
c  in DIMACS:
-1319  1320 -1321  53  1322 0
-1319  1320 -1321  53  1323 0
-1319  1320 -1321  53 -1324 0

c  -2-1 --> break 
c    ( b^{1, 53}_2 ∧  b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧ -p_53) -> break
c  in CNF:
c    -b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨  b^{1, 53}_0 ∨  p_53 ∨ break
c  in DIMACS:
-1319 -1320  1321  53 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 53}_2 ∧ -b^{1, 53}_1 ∧ -b^{1, 53}_0 ∧ true) 
c  in CNF:
c    -b^{1, 53}_2 ∨  b^{1, 53}_1 ∨  b^{1, 53}_0 ∨ false 
c  in DIMACS:
-1319  1320  1321  0

c  3 does not represent an automaton state.
c    -(-b^{1, 53}_2 ∧  b^{1, 53}_1 ∧  b^{1, 53}_0 ∧ true) 
c  in CNF:
c     b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ false 
c  in DIMACS:
 1319 -1320 -1321  0
c  -3 does not represent an automaton state.
c    -( b^{1, 53}_2 ∧  b^{1, 53}_1 ∧  b^{1, 53}_0 ∧ true) 
c  in CNF:
c    -b^{1, 53}_2 ∨ -b^{1, 53}_1 ∨ -b^{1, 53}_0 ∨ false 
c  in DIMACS:
-1319 -1320 -1321  0

c i = 54
c  -2+1 --> -1
c    ( b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧  p_54) -> ( b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0)
c  in CNF:
c    -b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨  b^{1, 55}_2
c    -b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_1
c    -b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨  b^{1, 55}_0
c  in DIMACS:
-1322 -1323  1324 -54  1325 0
-1322 -1323  1324 -54 -1326 0
-1322 -1323  1324 -54  1327 0

c  -1+1 --> 0
c    ( b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0 ∧  p_54) -> (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧ -b^{1, 55}_0)
c  in CNF:
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_2
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_1
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_0
c  in DIMACS:
-1322  1323 -1324 -54 -1325 0
-1322  1323 -1324 -54 -1326 0
-1322  1323 -1324 -54 -1327 0

c  0+1 --> 1
c    (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧  p_54) -> (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0)
c  in CNF:
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_2
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_1
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨  b^{1, 55}_0
c  in DIMACS:
 1322  1323  1324 -54 -1325 0
 1322  1323  1324 -54 -1326 0
 1322  1323  1324 -54  1327 0

c  1+1 --> 2
c    (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0 ∧  p_54) -> (-b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0)
c  in CNF:
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_2
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨  b^{1, 55}_1
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ -p_54 ∨ -b^{1, 55}_0
c  in DIMACS:
 1322  1323 -1324 -54 -1325 0
 1322  1323 -1324 -54  1326 0
 1322  1323 -1324 -54 -1327 0

c  2+1 --> break 
c    (-b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧  p_54) -> break
c  in CNF:
c     b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 1322 -1323  1324 -54 1162 0


c  2-1 --> 1
c    (-b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧ -p_54) -> (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0)
c  in CNF:
c     b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_2
c     b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_1
c     b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨  b^{1, 55}_0
c  in DIMACS:
 1322 -1323  1324  54 -1325 0
 1322 -1323  1324  54 -1326 0
 1322 -1323  1324  54  1327 0

c  1-1 --> 0
c    (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0 ∧ -p_54) -> (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧ -b^{1, 55}_0)
c  in CNF:
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_2
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_1
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_0
c  in DIMACS:
 1322  1323 -1324  54 -1325 0
 1322  1323 -1324  54 -1326 0
 1322  1323 -1324  54 -1327 0

c  0-1 --> -1
c    (-b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧ -p_54) -> ( b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0)
c  in CNF:
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨  b^{1, 55}_2
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_1
c     b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨  b^{1, 55}_0
c  in DIMACS:
 1322  1323  1324  54  1325 0
 1322  1323  1324  54 -1326 0
 1322  1323  1324  54  1327 0

c  -1-1 --> -2
c    ( b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧  b^{1, 54}_0 ∧ -p_54) -> ( b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0)
c  in CNF:
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨  b^{1, 55}_2
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨  b^{1, 55}_1
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨  p_54 ∨ -b^{1, 55}_0
c  in DIMACS:
-1322  1323 -1324  54  1325 0
-1322  1323 -1324  54  1326 0
-1322  1323 -1324  54 -1327 0

c  -2-1 --> break 
c    ( b^{1, 54}_2 ∧  b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨  b^{1, 54}_0 ∨  p_54 ∨ break
c  in DIMACS:
-1322 -1323  1324  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 54}_2 ∧ -b^{1, 54}_1 ∧ -b^{1, 54}_0 ∧ true) 
c  in CNF:
c    -b^{1, 54}_2 ∨  b^{1, 54}_1 ∨  b^{1, 54}_0 ∨ false 
c  in DIMACS:
-1322  1323  1324  0

c  3 does not represent an automaton state.
c    -(-b^{1, 54}_2 ∧  b^{1, 54}_1 ∧  b^{1, 54}_0 ∧ true) 
c  in CNF:
c     b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ false 
c  in DIMACS:
 1322 -1323 -1324  0
c  -3 does not represent an automaton state.
c    -( b^{1, 54}_2 ∧  b^{1, 54}_1 ∧  b^{1, 54}_0 ∧ true) 
c  in CNF:
c    -b^{1, 54}_2 ∨ -b^{1, 54}_1 ∨ -b^{1, 54}_0 ∨ false 
c  in DIMACS:
-1322 -1323 -1324  0

c i = 55
c  -2+1 --> -1
c    ( b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧  p_55) -> ( b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0)
c  in CNF:
c    -b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨  b^{1, 56}_2
c    -b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_1
c    -b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨  b^{1, 56}_0
c  in DIMACS:
-1325 -1326  1327 -55  1328 0
-1325 -1326  1327 -55 -1329 0
-1325 -1326  1327 -55  1330 0

c  -1+1 --> 0
c    ( b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0 ∧  p_55) -> (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧ -b^{1, 56}_0)
c  in CNF:
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_2
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_1
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_0
c  in DIMACS:
-1325  1326 -1327 -55 -1328 0
-1325  1326 -1327 -55 -1329 0
-1325  1326 -1327 -55 -1330 0

c  0+1 --> 1
c    (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧  p_55) -> (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0)
c  in CNF:
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_2
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_1
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨  b^{1, 56}_0
c  in DIMACS:
 1325  1326  1327 -55 -1328 0
 1325  1326  1327 -55 -1329 0
 1325  1326  1327 -55  1330 0

c  1+1 --> 2
c    (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0 ∧  p_55) -> (-b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0)
c  in CNF:
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_2
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨  b^{1, 56}_1
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ -p_55 ∨ -b^{1, 56}_0
c  in DIMACS:
 1325  1326 -1327 -55 -1328 0
 1325  1326 -1327 -55  1329 0
 1325  1326 -1327 -55 -1330 0

c  2+1 --> break 
c    (-b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧  p_55) -> break
c  in CNF:
c     b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ -p_55 ∨ break
c  in DIMACS:
 1325 -1326  1327 -55 1162 0


c  2-1 --> 1
c    (-b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧ -p_55) -> (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0)
c  in CNF:
c     b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_2
c     b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_1
c     b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨  b^{1, 56}_0
c  in DIMACS:
 1325 -1326  1327  55 -1328 0
 1325 -1326  1327  55 -1329 0
 1325 -1326  1327  55  1330 0

c  1-1 --> 0
c    (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0 ∧ -p_55) -> (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧ -b^{1, 56}_0)
c  in CNF:
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_2
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_1
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_0
c  in DIMACS:
 1325  1326 -1327  55 -1328 0
 1325  1326 -1327  55 -1329 0
 1325  1326 -1327  55 -1330 0

c  0-1 --> -1
c    (-b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧ -p_55) -> ( b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0)
c  in CNF:
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨  b^{1, 56}_2
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_1
c     b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨  b^{1, 56}_0
c  in DIMACS:
 1325  1326  1327  55  1328 0
 1325  1326  1327  55 -1329 0
 1325  1326  1327  55  1330 0

c  -1-1 --> -2
c    ( b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧  b^{1, 55}_0 ∧ -p_55) -> ( b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0)
c  in CNF:
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨  b^{1, 56}_2
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨  b^{1, 56}_1
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨  p_55 ∨ -b^{1, 56}_0
c  in DIMACS:
-1325  1326 -1327  55  1328 0
-1325  1326 -1327  55  1329 0
-1325  1326 -1327  55 -1330 0

c  -2-1 --> break 
c    ( b^{1, 55}_2 ∧  b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧ -p_55) -> break
c  in CNF:
c    -b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨  b^{1, 55}_0 ∨  p_55 ∨ break
c  in DIMACS:
-1325 -1326  1327  55 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 55}_2 ∧ -b^{1, 55}_1 ∧ -b^{1, 55}_0 ∧ true) 
c  in CNF:
c    -b^{1, 55}_2 ∨  b^{1, 55}_1 ∨  b^{1, 55}_0 ∨ false 
c  in DIMACS:
-1325  1326  1327  0

c  3 does not represent an automaton state.
c    -(-b^{1, 55}_2 ∧  b^{1, 55}_1 ∧  b^{1, 55}_0 ∧ true) 
c  in CNF:
c     b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ false 
c  in DIMACS:
 1325 -1326 -1327  0
c  -3 does not represent an automaton state.
c    -( b^{1, 55}_2 ∧  b^{1, 55}_1 ∧  b^{1, 55}_0 ∧ true) 
c  in CNF:
c    -b^{1, 55}_2 ∨ -b^{1, 55}_1 ∨ -b^{1, 55}_0 ∨ false 
c  in DIMACS:
-1325 -1326 -1327  0

c i = 56
c  -2+1 --> -1
c    ( b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧  p_56) -> ( b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0)
c  in CNF:
c    -b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨  b^{1, 57}_2
c    -b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_1
c    -b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨  b^{1, 57}_0
c  in DIMACS:
-1328 -1329  1330 -56  1331 0
-1328 -1329  1330 -56 -1332 0
-1328 -1329  1330 -56  1333 0

c  -1+1 --> 0
c    ( b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0 ∧  p_56) -> (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧ -b^{1, 57}_0)
c  in CNF:
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_2
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_1
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_0
c  in DIMACS:
-1328  1329 -1330 -56 -1331 0
-1328  1329 -1330 -56 -1332 0
-1328  1329 -1330 -56 -1333 0

c  0+1 --> 1
c    (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧  p_56) -> (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0)
c  in CNF:
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_2
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_1
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨  b^{1, 57}_0
c  in DIMACS:
 1328  1329  1330 -56 -1331 0
 1328  1329  1330 -56 -1332 0
 1328  1329  1330 -56  1333 0

c  1+1 --> 2
c    (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0 ∧  p_56) -> (-b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0)
c  in CNF:
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_2
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨  b^{1, 57}_1
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ -p_56 ∨ -b^{1, 57}_0
c  in DIMACS:
 1328  1329 -1330 -56 -1331 0
 1328  1329 -1330 -56  1332 0
 1328  1329 -1330 -56 -1333 0

c  2+1 --> break 
c    (-b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧  p_56) -> break
c  in CNF:
c     b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 1328 -1329  1330 -56 1162 0


c  2-1 --> 1
c    (-b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧ -p_56) -> (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0)
c  in CNF:
c     b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_2
c     b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_1
c     b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨  b^{1, 57}_0
c  in DIMACS:
 1328 -1329  1330  56 -1331 0
 1328 -1329  1330  56 -1332 0
 1328 -1329  1330  56  1333 0

c  1-1 --> 0
c    (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0 ∧ -p_56) -> (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧ -b^{1, 57}_0)
c  in CNF:
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_2
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_1
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_0
c  in DIMACS:
 1328  1329 -1330  56 -1331 0
 1328  1329 -1330  56 -1332 0
 1328  1329 -1330  56 -1333 0

c  0-1 --> -1
c    (-b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧ -p_56) -> ( b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0)
c  in CNF:
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨  b^{1, 57}_2
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_1
c     b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨  b^{1, 57}_0
c  in DIMACS:
 1328  1329  1330  56  1331 0
 1328  1329  1330  56 -1332 0
 1328  1329  1330  56  1333 0

c  -1-1 --> -2
c    ( b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧  b^{1, 56}_0 ∧ -p_56) -> ( b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0)
c  in CNF:
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨  b^{1, 57}_2
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨  b^{1, 57}_1
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨  p_56 ∨ -b^{1, 57}_0
c  in DIMACS:
-1328  1329 -1330  56  1331 0
-1328  1329 -1330  56  1332 0
-1328  1329 -1330  56 -1333 0

c  -2-1 --> break 
c    ( b^{1, 56}_2 ∧  b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨  b^{1, 56}_0 ∨  p_56 ∨ break
c  in DIMACS:
-1328 -1329  1330  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 56}_2 ∧ -b^{1, 56}_1 ∧ -b^{1, 56}_0 ∧ true) 
c  in CNF:
c    -b^{1, 56}_2 ∨  b^{1, 56}_1 ∨  b^{1, 56}_0 ∨ false 
c  in DIMACS:
-1328  1329  1330  0

c  3 does not represent an automaton state.
c    -(-b^{1, 56}_2 ∧  b^{1, 56}_1 ∧  b^{1, 56}_0 ∧ true) 
c  in CNF:
c     b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ false 
c  in DIMACS:
 1328 -1329 -1330  0
c  -3 does not represent an automaton state.
c    -( b^{1, 56}_2 ∧  b^{1, 56}_1 ∧  b^{1, 56}_0 ∧ true) 
c  in CNF:
c    -b^{1, 56}_2 ∨ -b^{1, 56}_1 ∨ -b^{1, 56}_0 ∨ false 
c  in DIMACS:
-1328 -1329 -1330  0

c i = 57
c  -2+1 --> -1
c    ( b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧  p_57) -> ( b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0)
c  in CNF:
c    -b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨  b^{1, 58}_2
c    -b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_1
c    -b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨  b^{1, 58}_0
c  in DIMACS:
-1331 -1332  1333 -57  1334 0
-1331 -1332  1333 -57 -1335 0
-1331 -1332  1333 -57  1336 0

c  -1+1 --> 0
c    ( b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0 ∧  p_57) -> (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧ -b^{1, 58}_0)
c  in CNF:
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_2
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_1
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_0
c  in DIMACS:
-1331  1332 -1333 -57 -1334 0
-1331  1332 -1333 -57 -1335 0
-1331  1332 -1333 -57 -1336 0

c  0+1 --> 1
c    (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧  p_57) -> (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0)
c  in CNF:
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_2
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_1
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨  b^{1, 58}_0
c  in DIMACS:
 1331  1332  1333 -57 -1334 0
 1331  1332  1333 -57 -1335 0
 1331  1332  1333 -57  1336 0

c  1+1 --> 2
c    (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0 ∧  p_57) -> (-b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0)
c  in CNF:
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_2
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨  b^{1, 58}_1
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ -p_57 ∨ -b^{1, 58}_0
c  in DIMACS:
 1331  1332 -1333 -57 -1334 0
 1331  1332 -1333 -57  1335 0
 1331  1332 -1333 -57 -1336 0

c  2+1 --> break 
c    (-b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧  p_57) -> break
c  in CNF:
c     b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ -p_57 ∨ break
c  in DIMACS:
 1331 -1332  1333 -57 1162 0


c  2-1 --> 1
c    (-b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧ -p_57) -> (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0)
c  in CNF:
c     b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_2
c     b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_1
c     b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨  b^{1, 58}_0
c  in DIMACS:
 1331 -1332  1333  57 -1334 0
 1331 -1332  1333  57 -1335 0
 1331 -1332  1333  57  1336 0

c  1-1 --> 0
c    (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0 ∧ -p_57) -> (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧ -b^{1, 58}_0)
c  in CNF:
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_2
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_1
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_0
c  in DIMACS:
 1331  1332 -1333  57 -1334 0
 1331  1332 -1333  57 -1335 0
 1331  1332 -1333  57 -1336 0

c  0-1 --> -1
c    (-b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧ -p_57) -> ( b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0)
c  in CNF:
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨  b^{1, 58}_2
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_1
c     b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨  b^{1, 58}_0
c  in DIMACS:
 1331  1332  1333  57  1334 0
 1331  1332  1333  57 -1335 0
 1331  1332  1333  57  1336 0

c  -1-1 --> -2
c    ( b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧  b^{1, 57}_0 ∧ -p_57) -> ( b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0)
c  in CNF:
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨  b^{1, 58}_2
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨  b^{1, 58}_1
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨  p_57 ∨ -b^{1, 58}_0
c  in DIMACS:
-1331  1332 -1333  57  1334 0
-1331  1332 -1333  57  1335 0
-1331  1332 -1333  57 -1336 0

c  -2-1 --> break 
c    ( b^{1, 57}_2 ∧  b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧ -p_57) -> break
c  in CNF:
c    -b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨  b^{1, 57}_0 ∨  p_57 ∨ break
c  in DIMACS:
-1331 -1332  1333  57 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 57}_2 ∧ -b^{1, 57}_1 ∧ -b^{1, 57}_0 ∧ true) 
c  in CNF:
c    -b^{1, 57}_2 ∨  b^{1, 57}_1 ∨  b^{1, 57}_0 ∨ false 
c  in DIMACS:
-1331  1332  1333  0

c  3 does not represent an automaton state.
c    -(-b^{1, 57}_2 ∧  b^{1, 57}_1 ∧  b^{1, 57}_0 ∧ true) 
c  in CNF:
c     b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ false 
c  in DIMACS:
 1331 -1332 -1333  0
c  -3 does not represent an automaton state.
c    -( b^{1, 57}_2 ∧  b^{1, 57}_1 ∧  b^{1, 57}_0 ∧ true) 
c  in CNF:
c    -b^{1, 57}_2 ∨ -b^{1, 57}_1 ∨ -b^{1, 57}_0 ∨ false 
c  in DIMACS:
-1331 -1332 -1333  0

c i = 58
c  -2+1 --> -1
c    ( b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧  p_58) -> ( b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0)
c  in CNF:
c    -b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨  b^{1, 59}_2
c    -b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_1
c    -b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨  b^{1, 59}_0
c  in DIMACS:
-1334 -1335  1336 -58  1337 0
-1334 -1335  1336 -58 -1338 0
-1334 -1335  1336 -58  1339 0

c  -1+1 --> 0
c    ( b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0 ∧  p_58) -> (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧ -b^{1, 59}_0)
c  in CNF:
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_2
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_1
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_0
c  in DIMACS:
-1334  1335 -1336 -58 -1337 0
-1334  1335 -1336 -58 -1338 0
-1334  1335 -1336 -58 -1339 0

c  0+1 --> 1
c    (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧  p_58) -> (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0)
c  in CNF:
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_2
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_1
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨  b^{1, 59}_0
c  in DIMACS:
 1334  1335  1336 -58 -1337 0
 1334  1335  1336 -58 -1338 0
 1334  1335  1336 -58  1339 0

c  1+1 --> 2
c    (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0 ∧  p_58) -> (-b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0)
c  in CNF:
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_2
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨  b^{1, 59}_1
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ -p_58 ∨ -b^{1, 59}_0
c  in DIMACS:
 1334  1335 -1336 -58 -1337 0
 1334  1335 -1336 -58  1338 0
 1334  1335 -1336 -58 -1339 0

c  2+1 --> break 
c    (-b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧  p_58) -> break
c  in CNF:
c     b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ -p_58 ∨ break
c  in DIMACS:
 1334 -1335  1336 -58 1162 0


c  2-1 --> 1
c    (-b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧ -p_58) -> (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0)
c  in CNF:
c     b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_2
c     b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_1
c     b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨  b^{1, 59}_0
c  in DIMACS:
 1334 -1335  1336  58 -1337 0
 1334 -1335  1336  58 -1338 0
 1334 -1335  1336  58  1339 0

c  1-1 --> 0
c    (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0 ∧ -p_58) -> (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧ -b^{1, 59}_0)
c  in CNF:
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_2
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_1
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_0
c  in DIMACS:
 1334  1335 -1336  58 -1337 0
 1334  1335 -1336  58 -1338 0
 1334  1335 -1336  58 -1339 0

c  0-1 --> -1
c    (-b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧ -p_58) -> ( b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0)
c  in CNF:
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨  b^{1, 59}_2
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_1
c     b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨  b^{1, 59}_0
c  in DIMACS:
 1334  1335  1336  58  1337 0
 1334  1335  1336  58 -1338 0
 1334  1335  1336  58  1339 0

c  -1-1 --> -2
c    ( b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧  b^{1, 58}_0 ∧ -p_58) -> ( b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0)
c  in CNF:
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨  b^{1, 59}_2
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨  b^{1, 59}_1
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨  p_58 ∨ -b^{1, 59}_0
c  in DIMACS:
-1334  1335 -1336  58  1337 0
-1334  1335 -1336  58  1338 0
-1334  1335 -1336  58 -1339 0

c  -2-1 --> break 
c    ( b^{1, 58}_2 ∧  b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧ -p_58) -> break
c  in CNF:
c    -b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨  b^{1, 58}_0 ∨  p_58 ∨ break
c  in DIMACS:
-1334 -1335  1336  58 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 58}_2 ∧ -b^{1, 58}_1 ∧ -b^{1, 58}_0 ∧ true) 
c  in CNF:
c    -b^{1, 58}_2 ∨  b^{1, 58}_1 ∨  b^{1, 58}_0 ∨ false 
c  in DIMACS:
-1334  1335  1336  0

c  3 does not represent an automaton state.
c    -(-b^{1, 58}_2 ∧  b^{1, 58}_1 ∧  b^{1, 58}_0 ∧ true) 
c  in CNF:
c     b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ false 
c  in DIMACS:
 1334 -1335 -1336  0
c  -3 does not represent an automaton state.
c    -( b^{1, 58}_2 ∧  b^{1, 58}_1 ∧  b^{1, 58}_0 ∧ true) 
c  in CNF:
c    -b^{1, 58}_2 ∨ -b^{1, 58}_1 ∨ -b^{1, 58}_0 ∨ false 
c  in DIMACS:
-1334 -1335 -1336  0

c i = 59
c  -2+1 --> -1
c    ( b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧  p_59) -> ( b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0)
c  in CNF:
c    -b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨  b^{1, 60}_2
c    -b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_1
c    -b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨  b^{1, 60}_0
c  in DIMACS:
-1337 -1338  1339 -59  1340 0
-1337 -1338  1339 -59 -1341 0
-1337 -1338  1339 -59  1342 0

c  -1+1 --> 0
c    ( b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0 ∧  p_59) -> (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧ -b^{1, 60}_0)
c  in CNF:
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_2
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_1
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_0
c  in DIMACS:
-1337  1338 -1339 -59 -1340 0
-1337  1338 -1339 -59 -1341 0
-1337  1338 -1339 -59 -1342 0

c  0+1 --> 1
c    (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧  p_59) -> (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0)
c  in CNF:
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_2
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_1
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨  b^{1, 60}_0
c  in DIMACS:
 1337  1338  1339 -59 -1340 0
 1337  1338  1339 -59 -1341 0
 1337  1338  1339 -59  1342 0

c  1+1 --> 2
c    (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0 ∧  p_59) -> (-b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0)
c  in CNF:
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_2
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨  b^{1, 60}_1
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ -p_59 ∨ -b^{1, 60}_0
c  in DIMACS:
 1337  1338 -1339 -59 -1340 0
 1337  1338 -1339 -59  1341 0
 1337  1338 -1339 -59 -1342 0

c  2+1 --> break 
c    (-b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧  p_59) -> break
c  in CNF:
c     b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ -p_59 ∨ break
c  in DIMACS:
 1337 -1338  1339 -59 1162 0


c  2-1 --> 1
c    (-b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧ -p_59) -> (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0)
c  in CNF:
c     b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_2
c     b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_1
c     b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨  b^{1, 60}_0
c  in DIMACS:
 1337 -1338  1339  59 -1340 0
 1337 -1338  1339  59 -1341 0
 1337 -1338  1339  59  1342 0

c  1-1 --> 0
c    (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0 ∧ -p_59) -> (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧ -b^{1, 60}_0)
c  in CNF:
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_2
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_1
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_0
c  in DIMACS:
 1337  1338 -1339  59 -1340 0
 1337  1338 -1339  59 -1341 0
 1337  1338 -1339  59 -1342 0

c  0-1 --> -1
c    (-b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧ -p_59) -> ( b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0)
c  in CNF:
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨  b^{1, 60}_2
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_1
c     b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨  b^{1, 60}_0
c  in DIMACS:
 1337  1338  1339  59  1340 0
 1337  1338  1339  59 -1341 0
 1337  1338  1339  59  1342 0

c  -1-1 --> -2
c    ( b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧  b^{1, 59}_0 ∧ -p_59) -> ( b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0)
c  in CNF:
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨  b^{1, 60}_2
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨  b^{1, 60}_1
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨  p_59 ∨ -b^{1, 60}_0
c  in DIMACS:
-1337  1338 -1339  59  1340 0
-1337  1338 -1339  59  1341 0
-1337  1338 -1339  59 -1342 0

c  -2-1 --> break 
c    ( b^{1, 59}_2 ∧  b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧ -p_59) -> break
c  in CNF:
c    -b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨  b^{1, 59}_0 ∨  p_59 ∨ break
c  in DIMACS:
-1337 -1338  1339  59 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 59}_2 ∧ -b^{1, 59}_1 ∧ -b^{1, 59}_0 ∧ true) 
c  in CNF:
c    -b^{1, 59}_2 ∨  b^{1, 59}_1 ∨  b^{1, 59}_0 ∨ false 
c  in DIMACS:
-1337  1338  1339  0

c  3 does not represent an automaton state.
c    -(-b^{1, 59}_2 ∧  b^{1, 59}_1 ∧  b^{1, 59}_0 ∧ true) 
c  in CNF:
c     b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ false 
c  in DIMACS:
 1337 -1338 -1339  0
c  -3 does not represent an automaton state.
c    -( b^{1, 59}_2 ∧  b^{1, 59}_1 ∧  b^{1, 59}_0 ∧ true) 
c  in CNF:
c    -b^{1, 59}_2 ∨ -b^{1, 59}_1 ∨ -b^{1, 59}_0 ∨ false 
c  in DIMACS:
-1337 -1338 -1339  0

c i = 60
c  -2+1 --> -1
c    ( b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧  p_60) -> ( b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0)
c  in CNF:
c    -b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨  b^{1, 61}_2
c    -b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_1
c    -b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨  b^{1, 61}_0
c  in DIMACS:
-1340 -1341  1342 -60  1343 0
-1340 -1341  1342 -60 -1344 0
-1340 -1341  1342 -60  1345 0

c  -1+1 --> 0
c    ( b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0 ∧  p_60) -> (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧ -b^{1, 61}_0)
c  in CNF:
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_2
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_1
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_0
c  in DIMACS:
-1340  1341 -1342 -60 -1343 0
-1340  1341 -1342 -60 -1344 0
-1340  1341 -1342 -60 -1345 0

c  0+1 --> 1
c    (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧  p_60) -> (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0)
c  in CNF:
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_2
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_1
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨  b^{1, 61}_0
c  in DIMACS:
 1340  1341  1342 -60 -1343 0
 1340  1341  1342 -60 -1344 0
 1340  1341  1342 -60  1345 0

c  1+1 --> 2
c    (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0 ∧  p_60) -> (-b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0)
c  in CNF:
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_2
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨  b^{1, 61}_1
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ -p_60 ∨ -b^{1, 61}_0
c  in DIMACS:
 1340  1341 -1342 -60 -1343 0
 1340  1341 -1342 -60  1344 0
 1340  1341 -1342 -60 -1345 0

c  2+1 --> break 
c    (-b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧  p_60) -> break
c  in CNF:
c     b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 1340 -1341  1342 -60 1162 0


c  2-1 --> 1
c    (-b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧ -p_60) -> (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0)
c  in CNF:
c     b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_2
c     b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_1
c     b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨  b^{1, 61}_0
c  in DIMACS:
 1340 -1341  1342  60 -1343 0
 1340 -1341  1342  60 -1344 0
 1340 -1341  1342  60  1345 0

c  1-1 --> 0
c    (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0 ∧ -p_60) -> (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧ -b^{1, 61}_0)
c  in CNF:
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_2
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_1
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_0
c  in DIMACS:
 1340  1341 -1342  60 -1343 0
 1340  1341 -1342  60 -1344 0
 1340  1341 -1342  60 -1345 0

c  0-1 --> -1
c    (-b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧ -p_60) -> ( b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0)
c  in CNF:
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨  b^{1, 61}_2
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_1
c     b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨  b^{1, 61}_0
c  in DIMACS:
 1340  1341  1342  60  1343 0
 1340  1341  1342  60 -1344 0
 1340  1341  1342  60  1345 0

c  -1-1 --> -2
c    ( b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧  b^{1, 60}_0 ∧ -p_60) -> ( b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0)
c  in CNF:
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨  b^{1, 61}_2
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨  b^{1, 61}_1
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨  p_60 ∨ -b^{1, 61}_0
c  in DIMACS:
-1340  1341 -1342  60  1343 0
-1340  1341 -1342  60  1344 0
-1340  1341 -1342  60 -1345 0

c  -2-1 --> break 
c    ( b^{1, 60}_2 ∧  b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨  b^{1, 60}_0 ∨  p_60 ∨ break
c  in DIMACS:
-1340 -1341  1342  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 60}_2 ∧ -b^{1, 60}_1 ∧ -b^{1, 60}_0 ∧ true) 
c  in CNF:
c    -b^{1, 60}_2 ∨  b^{1, 60}_1 ∨  b^{1, 60}_0 ∨ false 
c  in DIMACS:
-1340  1341  1342  0

c  3 does not represent an automaton state.
c    -(-b^{1, 60}_2 ∧  b^{1, 60}_1 ∧  b^{1, 60}_0 ∧ true) 
c  in CNF:
c     b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ false 
c  in DIMACS:
 1340 -1341 -1342  0
c  -3 does not represent an automaton state.
c    -( b^{1, 60}_2 ∧  b^{1, 60}_1 ∧  b^{1, 60}_0 ∧ true) 
c  in CNF:
c    -b^{1, 60}_2 ∨ -b^{1, 60}_1 ∨ -b^{1, 60}_0 ∨ false 
c  in DIMACS:
-1340 -1341 -1342  0

c i = 61
c  -2+1 --> -1
c    ( b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧  p_61) -> ( b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0)
c  in CNF:
c    -b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨  b^{1, 62}_2
c    -b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_1
c    -b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨  b^{1, 62}_0
c  in DIMACS:
-1343 -1344  1345 -61  1346 0
-1343 -1344  1345 -61 -1347 0
-1343 -1344  1345 -61  1348 0

c  -1+1 --> 0
c    ( b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0 ∧  p_61) -> (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧ -b^{1, 62}_0)
c  in CNF:
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_2
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_1
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_0
c  in DIMACS:
-1343  1344 -1345 -61 -1346 0
-1343  1344 -1345 -61 -1347 0
-1343  1344 -1345 -61 -1348 0

c  0+1 --> 1
c    (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧  p_61) -> (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0)
c  in CNF:
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_2
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_1
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨  b^{1, 62}_0
c  in DIMACS:
 1343  1344  1345 -61 -1346 0
 1343  1344  1345 -61 -1347 0
 1343  1344  1345 -61  1348 0

c  1+1 --> 2
c    (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0 ∧  p_61) -> (-b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0)
c  in CNF:
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_2
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨  b^{1, 62}_1
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ -p_61 ∨ -b^{1, 62}_0
c  in DIMACS:
 1343  1344 -1345 -61 -1346 0
 1343  1344 -1345 -61  1347 0
 1343  1344 -1345 -61 -1348 0

c  2+1 --> break 
c    (-b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧  p_61) -> break
c  in CNF:
c     b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ -p_61 ∨ break
c  in DIMACS:
 1343 -1344  1345 -61 1162 0


c  2-1 --> 1
c    (-b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧ -p_61) -> (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0)
c  in CNF:
c     b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_2
c     b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_1
c     b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨  b^{1, 62}_0
c  in DIMACS:
 1343 -1344  1345  61 -1346 0
 1343 -1344  1345  61 -1347 0
 1343 -1344  1345  61  1348 0

c  1-1 --> 0
c    (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0 ∧ -p_61) -> (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧ -b^{1, 62}_0)
c  in CNF:
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_2
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_1
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_0
c  in DIMACS:
 1343  1344 -1345  61 -1346 0
 1343  1344 -1345  61 -1347 0
 1343  1344 -1345  61 -1348 0

c  0-1 --> -1
c    (-b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧ -p_61) -> ( b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0)
c  in CNF:
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨  b^{1, 62}_2
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_1
c     b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨  b^{1, 62}_0
c  in DIMACS:
 1343  1344  1345  61  1346 0
 1343  1344  1345  61 -1347 0
 1343  1344  1345  61  1348 0

c  -1-1 --> -2
c    ( b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧  b^{1, 61}_0 ∧ -p_61) -> ( b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0)
c  in CNF:
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨  b^{1, 62}_2
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨  b^{1, 62}_1
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨  p_61 ∨ -b^{1, 62}_0
c  in DIMACS:
-1343  1344 -1345  61  1346 0
-1343  1344 -1345  61  1347 0
-1343  1344 -1345  61 -1348 0

c  -2-1 --> break 
c    ( b^{1, 61}_2 ∧  b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧ -p_61) -> break
c  in CNF:
c    -b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨  b^{1, 61}_0 ∨  p_61 ∨ break
c  in DIMACS:
-1343 -1344  1345  61 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 61}_2 ∧ -b^{1, 61}_1 ∧ -b^{1, 61}_0 ∧ true) 
c  in CNF:
c    -b^{1, 61}_2 ∨  b^{1, 61}_1 ∨  b^{1, 61}_0 ∨ false 
c  in DIMACS:
-1343  1344  1345  0

c  3 does not represent an automaton state.
c    -(-b^{1, 61}_2 ∧  b^{1, 61}_1 ∧  b^{1, 61}_0 ∧ true) 
c  in CNF:
c     b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ false 
c  in DIMACS:
 1343 -1344 -1345  0
c  -3 does not represent an automaton state.
c    -( b^{1, 61}_2 ∧  b^{1, 61}_1 ∧  b^{1, 61}_0 ∧ true) 
c  in CNF:
c    -b^{1, 61}_2 ∨ -b^{1, 61}_1 ∨ -b^{1, 61}_0 ∨ false 
c  in DIMACS:
-1343 -1344 -1345  0

c i = 62
c  -2+1 --> -1
c    ( b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧  p_62) -> ( b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0)
c  in CNF:
c    -b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨  b^{1, 63}_2
c    -b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_1
c    -b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨  b^{1, 63}_0
c  in DIMACS:
-1346 -1347  1348 -62  1349 0
-1346 -1347  1348 -62 -1350 0
-1346 -1347  1348 -62  1351 0

c  -1+1 --> 0
c    ( b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0 ∧  p_62) -> (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧ -b^{1, 63}_0)
c  in CNF:
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_2
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_1
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_0
c  in DIMACS:
-1346  1347 -1348 -62 -1349 0
-1346  1347 -1348 -62 -1350 0
-1346  1347 -1348 -62 -1351 0

c  0+1 --> 1
c    (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧  p_62) -> (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0)
c  in CNF:
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_2
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_1
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨  b^{1, 63}_0
c  in DIMACS:
 1346  1347  1348 -62 -1349 0
 1346  1347  1348 -62 -1350 0
 1346  1347  1348 -62  1351 0

c  1+1 --> 2
c    (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0 ∧  p_62) -> (-b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0)
c  in CNF:
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_2
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨  b^{1, 63}_1
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ -p_62 ∨ -b^{1, 63}_0
c  in DIMACS:
 1346  1347 -1348 -62 -1349 0
 1346  1347 -1348 -62  1350 0
 1346  1347 -1348 -62 -1351 0

c  2+1 --> break 
c    (-b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧  p_62) -> break
c  in CNF:
c     b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ -p_62 ∨ break
c  in DIMACS:
 1346 -1347  1348 -62 1162 0


c  2-1 --> 1
c    (-b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧ -p_62) -> (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0)
c  in CNF:
c     b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_2
c     b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_1
c     b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨  b^{1, 63}_0
c  in DIMACS:
 1346 -1347  1348  62 -1349 0
 1346 -1347  1348  62 -1350 0
 1346 -1347  1348  62  1351 0

c  1-1 --> 0
c    (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0 ∧ -p_62) -> (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧ -b^{1, 63}_0)
c  in CNF:
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_2
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_1
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_0
c  in DIMACS:
 1346  1347 -1348  62 -1349 0
 1346  1347 -1348  62 -1350 0
 1346  1347 -1348  62 -1351 0

c  0-1 --> -1
c    (-b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧ -p_62) -> ( b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0)
c  in CNF:
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨  b^{1, 63}_2
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_1
c     b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨  b^{1, 63}_0
c  in DIMACS:
 1346  1347  1348  62  1349 0
 1346  1347  1348  62 -1350 0
 1346  1347  1348  62  1351 0

c  -1-1 --> -2
c    ( b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧  b^{1, 62}_0 ∧ -p_62) -> ( b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0)
c  in CNF:
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨  b^{1, 63}_2
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨  b^{1, 63}_1
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨  p_62 ∨ -b^{1, 63}_0
c  in DIMACS:
-1346  1347 -1348  62  1349 0
-1346  1347 -1348  62  1350 0
-1346  1347 -1348  62 -1351 0

c  -2-1 --> break 
c    ( b^{1, 62}_2 ∧  b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧ -p_62) -> break
c  in CNF:
c    -b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨  b^{1, 62}_0 ∨  p_62 ∨ break
c  in DIMACS:
-1346 -1347  1348  62 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 62}_2 ∧ -b^{1, 62}_1 ∧ -b^{1, 62}_0 ∧ true) 
c  in CNF:
c    -b^{1, 62}_2 ∨  b^{1, 62}_1 ∨  b^{1, 62}_0 ∨ false 
c  in DIMACS:
-1346  1347  1348  0

c  3 does not represent an automaton state.
c    -(-b^{1, 62}_2 ∧  b^{1, 62}_1 ∧  b^{1, 62}_0 ∧ true) 
c  in CNF:
c     b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ false 
c  in DIMACS:
 1346 -1347 -1348  0
c  -3 does not represent an automaton state.
c    -( b^{1, 62}_2 ∧  b^{1, 62}_1 ∧  b^{1, 62}_0 ∧ true) 
c  in CNF:
c    -b^{1, 62}_2 ∨ -b^{1, 62}_1 ∨ -b^{1, 62}_0 ∨ false 
c  in DIMACS:
-1346 -1347 -1348  0

c i = 63
c  -2+1 --> -1
c    ( b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧  p_63) -> ( b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0)
c  in CNF:
c    -b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨  b^{1, 64}_2
c    -b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_1
c    -b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨  b^{1, 64}_0
c  in DIMACS:
-1349 -1350  1351 -63  1352 0
-1349 -1350  1351 -63 -1353 0
-1349 -1350  1351 -63  1354 0

c  -1+1 --> 0
c    ( b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0 ∧  p_63) -> (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧ -b^{1, 64}_0)
c  in CNF:
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_2
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_1
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_0
c  in DIMACS:
-1349  1350 -1351 -63 -1352 0
-1349  1350 -1351 -63 -1353 0
-1349  1350 -1351 -63 -1354 0

c  0+1 --> 1
c    (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧  p_63) -> (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0)
c  in CNF:
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_2
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_1
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨  b^{1, 64}_0
c  in DIMACS:
 1349  1350  1351 -63 -1352 0
 1349  1350  1351 -63 -1353 0
 1349  1350  1351 -63  1354 0

c  1+1 --> 2
c    (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0 ∧  p_63) -> (-b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0)
c  in CNF:
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_2
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨  b^{1, 64}_1
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ -p_63 ∨ -b^{1, 64}_0
c  in DIMACS:
 1349  1350 -1351 -63 -1352 0
 1349  1350 -1351 -63  1353 0
 1349  1350 -1351 -63 -1354 0

c  2+1 --> break 
c    (-b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧  p_63) -> break
c  in CNF:
c     b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 1349 -1350  1351 -63 1162 0


c  2-1 --> 1
c    (-b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧ -p_63) -> (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0)
c  in CNF:
c     b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_2
c     b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_1
c     b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨  b^{1, 64}_0
c  in DIMACS:
 1349 -1350  1351  63 -1352 0
 1349 -1350  1351  63 -1353 0
 1349 -1350  1351  63  1354 0

c  1-1 --> 0
c    (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0 ∧ -p_63) -> (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧ -b^{1, 64}_0)
c  in CNF:
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_2
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_1
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_0
c  in DIMACS:
 1349  1350 -1351  63 -1352 0
 1349  1350 -1351  63 -1353 0
 1349  1350 -1351  63 -1354 0

c  0-1 --> -1
c    (-b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧ -p_63) -> ( b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0)
c  in CNF:
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨  b^{1, 64}_2
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_1
c     b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨  b^{1, 64}_0
c  in DIMACS:
 1349  1350  1351  63  1352 0
 1349  1350  1351  63 -1353 0
 1349  1350  1351  63  1354 0

c  -1-1 --> -2
c    ( b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧  b^{1, 63}_0 ∧ -p_63) -> ( b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0)
c  in CNF:
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨  b^{1, 64}_2
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨  b^{1, 64}_1
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨  p_63 ∨ -b^{1, 64}_0
c  in DIMACS:
-1349  1350 -1351  63  1352 0
-1349  1350 -1351  63  1353 0
-1349  1350 -1351  63 -1354 0

c  -2-1 --> break 
c    ( b^{1, 63}_2 ∧  b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨  b^{1, 63}_0 ∨  p_63 ∨ break
c  in DIMACS:
-1349 -1350  1351  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 63}_2 ∧ -b^{1, 63}_1 ∧ -b^{1, 63}_0 ∧ true) 
c  in CNF:
c    -b^{1, 63}_2 ∨  b^{1, 63}_1 ∨  b^{1, 63}_0 ∨ false 
c  in DIMACS:
-1349  1350  1351  0

c  3 does not represent an automaton state.
c    -(-b^{1, 63}_2 ∧  b^{1, 63}_1 ∧  b^{1, 63}_0 ∧ true) 
c  in CNF:
c     b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ false 
c  in DIMACS:
 1349 -1350 -1351  0
c  -3 does not represent an automaton state.
c    -( b^{1, 63}_2 ∧  b^{1, 63}_1 ∧  b^{1, 63}_0 ∧ true) 
c  in CNF:
c    -b^{1, 63}_2 ∨ -b^{1, 63}_1 ∨ -b^{1, 63}_0 ∨ false 
c  in DIMACS:
-1349 -1350 -1351  0

c i = 64
c  -2+1 --> -1
c    ( b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧  p_64) -> ( b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0)
c  in CNF:
c    -b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨  b^{1, 65}_2
c    -b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_1
c    -b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨  b^{1, 65}_0
c  in DIMACS:
-1352 -1353  1354 -64  1355 0
-1352 -1353  1354 -64 -1356 0
-1352 -1353  1354 -64  1357 0

c  -1+1 --> 0
c    ( b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0 ∧  p_64) -> (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧ -b^{1, 65}_0)
c  in CNF:
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_2
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_1
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_0
c  in DIMACS:
-1352  1353 -1354 -64 -1355 0
-1352  1353 -1354 -64 -1356 0
-1352  1353 -1354 -64 -1357 0

c  0+1 --> 1
c    (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧  p_64) -> (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0)
c  in CNF:
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_2
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_1
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨  b^{1, 65}_0
c  in DIMACS:
 1352  1353  1354 -64 -1355 0
 1352  1353  1354 -64 -1356 0
 1352  1353  1354 -64  1357 0

c  1+1 --> 2
c    (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0 ∧  p_64) -> (-b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0)
c  in CNF:
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_2
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨  b^{1, 65}_1
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ -p_64 ∨ -b^{1, 65}_0
c  in DIMACS:
 1352  1353 -1354 -64 -1355 0
 1352  1353 -1354 -64  1356 0
 1352  1353 -1354 -64 -1357 0

c  2+1 --> break 
c    (-b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧  p_64) -> break
c  in CNF:
c     b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 1352 -1353  1354 -64 1162 0


c  2-1 --> 1
c    (-b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧ -p_64) -> (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0)
c  in CNF:
c     b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_2
c     b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_1
c     b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨  b^{1, 65}_0
c  in DIMACS:
 1352 -1353  1354  64 -1355 0
 1352 -1353  1354  64 -1356 0
 1352 -1353  1354  64  1357 0

c  1-1 --> 0
c    (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0 ∧ -p_64) -> (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧ -b^{1, 65}_0)
c  in CNF:
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_2
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_1
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_0
c  in DIMACS:
 1352  1353 -1354  64 -1355 0
 1352  1353 -1354  64 -1356 0
 1352  1353 -1354  64 -1357 0

c  0-1 --> -1
c    (-b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧ -p_64) -> ( b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0)
c  in CNF:
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨  b^{1, 65}_2
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_1
c     b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨  b^{1, 65}_0
c  in DIMACS:
 1352  1353  1354  64  1355 0
 1352  1353  1354  64 -1356 0
 1352  1353  1354  64  1357 0

c  -1-1 --> -2
c    ( b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧  b^{1, 64}_0 ∧ -p_64) -> ( b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0)
c  in CNF:
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨  b^{1, 65}_2
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨  b^{1, 65}_1
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨  p_64 ∨ -b^{1, 65}_0
c  in DIMACS:
-1352  1353 -1354  64  1355 0
-1352  1353 -1354  64  1356 0
-1352  1353 -1354  64 -1357 0

c  -2-1 --> break 
c    ( b^{1, 64}_2 ∧  b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨  b^{1, 64}_0 ∨  p_64 ∨ break
c  in DIMACS:
-1352 -1353  1354  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 64}_2 ∧ -b^{1, 64}_1 ∧ -b^{1, 64}_0 ∧ true) 
c  in CNF:
c    -b^{1, 64}_2 ∨  b^{1, 64}_1 ∨  b^{1, 64}_0 ∨ false 
c  in DIMACS:
-1352  1353  1354  0

c  3 does not represent an automaton state.
c    -(-b^{1, 64}_2 ∧  b^{1, 64}_1 ∧  b^{1, 64}_0 ∧ true) 
c  in CNF:
c     b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ false 
c  in DIMACS:
 1352 -1353 -1354  0
c  -3 does not represent an automaton state.
c    -( b^{1, 64}_2 ∧  b^{1, 64}_1 ∧  b^{1, 64}_0 ∧ true) 
c  in CNF:
c    -b^{1, 64}_2 ∨ -b^{1, 64}_1 ∨ -b^{1, 64}_0 ∨ false 
c  in DIMACS:
-1352 -1353 -1354  0

c i = 65
c  -2+1 --> -1
c    ( b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧  p_65) -> ( b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0)
c  in CNF:
c    -b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨  b^{1, 66}_2
c    -b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_1
c    -b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨  b^{1, 66}_0
c  in DIMACS:
-1355 -1356  1357 -65  1358 0
-1355 -1356  1357 -65 -1359 0
-1355 -1356  1357 -65  1360 0

c  -1+1 --> 0
c    ( b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0 ∧  p_65) -> (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧ -b^{1, 66}_0)
c  in CNF:
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_2
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_1
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_0
c  in DIMACS:
-1355  1356 -1357 -65 -1358 0
-1355  1356 -1357 -65 -1359 0
-1355  1356 -1357 -65 -1360 0

c  0+1 --> 1
c    (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧  p_65) -> (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0)
c  in CNF:
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_2
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_1
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨  b^{1, 66}_0
c  in DIMACS:
 1355  1356  1357 -65 -1358 0
 1355  1356  1357 -65 -1359 0
 1355  1356  1357 -65  1360 0

c  1+1 --> 2
c    (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0 ∧  p_65) -> (-b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0)
c  in CNF:
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_2
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨  b^{1, 66}_1
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ -p_65 ∨ -b^{1, 66}_0
c  in DIMACS:
 1355  1356 -1357 -65 -1358 0
 1355  1356 -1357 -65  1359 0
 1355  1356 -1357 -65 -1360 0

c  2+1 --> break 
c    (-b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧  p_65) -> break
c  in CNF:
c     b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ -p_65 ∨ break
c  in DIMACS:
 1355 -1356  1357 -65 1162 0


c  2-1 --> 1
c    (-b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧ -p_65) -> (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0)
c  in CNF:
c     b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_2
c     b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_1
c     b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨  b^{1, 66}_0
c  in DIMACS:
 1355 -1356  1357  65 -1358 0
 1355 -1356  1357  65 -1359 0
 1355 -1356  1357  65  1360 0

c  1-1 --> 0
c    (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0 ∧ -p_65) -> (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧ -b^{1, 66}_0)
c  in CNF:
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_2
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_1
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_0
c  in DIMACS:
 1355  1356 -1357  65 -1358 0
 1355  1356 -1357  65 -1359 0
 1355  1356 -1357  65 -1360 0

c  0-1 --> -1
c    (-b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧ -p_65) -> ( b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0)
c  in CNF:
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨  b^{1, 66}_2
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_1
c     b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨  b^{1, 66}_0
c  in DIMACS:
 1355  1356  1357  65  1358 0
 1355  1356  1357  65 -1359 0
 1355  1356  1357  65  1360 0

c  -1-1 --> -2
c    ( b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧  b^{1, 65}_0 ∧ -p_65) -> ( b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0)
c  in CNF:
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨  b^{1, 66}_2
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨  b^{1, 66}_1
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨  p_65 ∨ -b^{1, 66}_0
c  in DIMACS:
-1355  1356 -1357  65  1358 0
-1355  1356 -1357  65  1359 0
-1355  1356 -1357  65 -1360 0

c  -2-1 --> break 
c    ( b^{1, 65}_2 ∧  b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧ -p_65) -> break
c  in CNF:
c    -b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨  b^{1, 65}_0 ∨  p_65 ∨ break
c  in DIMACS:
-1355 -1356  1357  65 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 65}_2 ∧ -b^{1, 65}_1 ∧ -b^{1, 65}_0 ∧ true) 
c  in CNF:
c    -b^{1, 65}_2 ∨  b^{1, 65}_1 ∨  b^{1, 65}_0 ∨ false 
c  in DIMACS:
-1355  1356  1357  0

c  3 does not represent an automaton state.
c    -(-b^{1, 65}_2 ∧  b^{1, 65}_1 ∧  b^{1, 65}_0 ∧ true) 
c  in CNF:
c     b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ false 
c  in DIMACS:
 1355 -1356 -1357  0
c  -3 does not represent an automaton state.
c    -( b^{1, 65}_2 ∧  b^{1, 65}_1 ∧  b^{1, 65}_0 ∧ true) 
c  in CNF:
c    -b^{1, 65}_2 ∨ -b^{1, 65}_1 ∨ -b^{1, 65}_0 ∨ false 
c  in DIMACS:
-1355 -1356 -1357  0

c i = 66
c  -2+1 --> -1
c    ( b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧  p_66) -> ( b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0)
c  in CNF:
c    -b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨  b^{1, 67}_2
c    -b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_1
c    -b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨  b^{1, 67}_0
c  in DIMACS:
-1358 -1359  1360 -66  1361 0
-1358 -1359  1360 -66 -1362 0
-1358 -1359  1360 -66  1363 0

c  -1+1 --> 0
c    ( b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0 ∧  p_66) -> (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧ -b^{1, 67}_0)
c  in CNF:
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_2
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_1
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_0
c  in DIMACS:
-1358  1359 -1360 -66 -1361 0
-1358  1359 -1360 -66 -1362 0
-1358  1359 -1360 -66 -1363 0

c  0+1 --> 1
c    (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧  p_66) -> (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0)
c  in CNF:
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_2
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_1
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨  b^{1, 67}_0
c  in DIMACS:
 1358  1359  1360 -66 -1361 0
 1358  1359  1360 -66 -1362 0
 1358  1359  1360 -66  1363 0

c  1+1 --> 2
c    (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0 ∧  p_66) -> (-b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0)
c  in CNF:
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_2
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨  b^{1, 67}_1
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ -p_66 ∨ -b^{1, 67}_0
c  in DIMACS:
 1358  1359 -1360 -66 -1361 0
 1358  1359 -1360 -66  1362 0
 1358  1359 -1360 -66 -1363 0

c  2+1 --> break 
c    (-b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧  p_66) -> break
c  in CNF:
c     b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 1358 -1359  1360 -66 1162 0


c  2-1 --> 1
c    (-b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧ -p_66) -> (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0)
c  in CNF:
c     b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_2
c     b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_1
c     b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨  b^{1, 67}_0
c  in DIMACS:
 1358 -1359  1360  66 -1361 0
 1358 -1359  1360  66 -1362 0
 1358 -1359  1360  66  1363 0

c  1-1 --> 0
c    (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0 ∧ -p_66) -> (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧ -b^{1, 67}_0)
c  in CNF:
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_2
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_1
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_0
c  in DIMACS:
 1358  1359 -1360  66 -1361 0
 1358  1359 -1360  66 -1362 0
 1358  1359 -1360  66 -1363 0

c  0-1 --> -1
c    (-b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧ -p_66) -> ( b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0)
c  in CNF:
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨  b^{1, 67}_2
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_1
c     b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨  b^{1, 67}_0
c  in DIMACS:
 1358  1359  1360  66  1361 0
 1358  1359  1360  66 -1362 0
 1358  1359  1360  66  1363 0

c  -1-1 --> -2
c    ( b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧  b^{1, 66}_0 ∧ -p_66) -> ( b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0)
c  in CNF:
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨  b^{1, 67}_2
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨  b^{1, 67}_1
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨  p_66 ∨ -b^{1, 67}_0
c  in DIMACS:
-1358  1359 -1360  66  1361 0
-1358  1359 -1360  66  1362 0
-1358  1359 -1360  66 -1363 0

c  -2-1 --> break 
c    ( b^{1, 66}_2 ∧  b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨  b^{1, 66}_0 ∨  p_66 ∨ break
c  in DIMACS:
-1358 -1359  1360  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 66}_2 ∧ -b^{1, 66}_1 ∧ -b^{1, 66}_0 ∧ true) 
c  in CNF:
c    -b^{1, 66}_2 ∨  b^{1, 66}_1 ∨  b^{1, 66}_0 ∨ false 
c  in DIMACS:
-1358  1359  1360  0

c  3 does not represent an automaton state.
c    -(-b^{1, 66}_2 ∧  b^{1, 66}_1 ∧  b^{1, 66}_0 ∧ true) 
c  in CNF:
c     b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ false 
c  in DIMACS:
 1358 -1359 -1360  0
c  -3 does not represent an automaton state.
c    -( b^{1, 66}_2 ∧  b^{1, 66}_1 ∧  b^{1, 66}_0 ∧ true) 
c  in CNF:
c    -b^{1, 66}_2 ∨ -b^{1, 66}_1 ∨ -b^{1, 66}_0 ∨ false 
c  in DIMACS:
-1358 -1359 -1360  0

c i = 67
c  -2+1 --> -1
c    ( b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧  p_67) -> ( b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0)
c  in CNF:
c    -b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨  b^{1, 68}_2
c    -b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_1
c    -b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨  b^{1, 68}_0
c  in DIMACS:
-1361 -1362  1363 -67  1364 0
-1361 -1362  1363 -67 -1365 0
-1361 -1362  1363 -67  1366 0

c  -1+1 --> 0
c    ( b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0 ∧  p_67) -> (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧ -b^{1, 68}_0)
c  in CNF:
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_2
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_1
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_0
c  in DIMACS:
-1361  1362 -1363 -67 -1364 0
-1361  1362 -1363 -67 -1365 0
-1361  1362 -1363 -67 -1366 0

c  0+1 --> 1
c    (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧  p_67) -> (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0)
c  in CNF:
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_2
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_1
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨  b^{1, 68}_0
c  in DIMACS:
 1361  1362  1363 -67 -1364 0
 1361  1362  1363 -67 -1365 0
 1361  1362  1363 -67  1366 0

c  1+1 --> 2
c    (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0 ∧  p_67) -> (-b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0)
c  in CNF:
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_2
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨  b^{1, 68}_1
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ -p_67 ∨ -b^{1, 68}_0
c  in DIMACS:
 1361  1362 -1363 -67 -1364 0
 1361  1362 -1363 -67  1365 0
 1361  1362 -1363 -67 -1366 0

c  2+1 --> break 
c    (-b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧  p_67) -> break
c  in CNF:
c     b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ -p_67 ∨ break
c  in DIMACS:
 1361 -1362  1363 -67 1162 0


c  2-1 --> 1
c    (-b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧ -p_67) -> (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0)
c  in CNF:
c     b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_2
c     b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_1
c     b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨  b^{1, 68}_0
c  in DIMACS:
 1361 -1362  1363  67 -1364 0
 1361 -1362  1363  67 -1365 0
 1361 -1362  1363  67  1366 0

c  1-1 --> 0
c    (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0 ∧ -p_67) -> (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧ -b^{1, 68}_0)
c  in CNF:
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_2
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_1
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_0
c  in DIMACS:
 1361  1362 -1363  67 -1364 0
 1361  1362 -1363  67 -1365 0
 1361  1362 -1363  67 -1366 0

c  0-1 --> -1
c    (-b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧ -p_67) -> ( b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0)
c  in CNF:
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨  b^{1, 68}_2
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_1
c     b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨  b^{1, 68}_0
c  in DIMACS:
 1361  1362  1363  67  1364 0
 1361  1362  1363  67 -1365 0
 1361  1362  1363  67  1366 0

c  -1-1 --> -2
c    ( b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧  b^{1, 67}_0 ∧ -p_67) -> ( b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0)
c  in CNF:
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨  b^{1, 68}_2
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨  b^{1, 68}_1
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨  p_67 ∨ -b^{1, 68}_0
c  in DIMACS:
-1361  1362 -1363  67  1364 0
-1361  1362 -1363  67  1365 0
-1361  1362 -1363  67 -1366 0

c  -2-1 --> break 
c    ( b^{1, 67}_2 ∧  b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧ -p_67) -> break
c  in CNF:
c    -b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨  b^{1, 67}_0 ∨  p_67 ∨ break
c  in DIMACS:
-1361 -1362  1363  67 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 67}_2 ∧ -b^{1, 67}_1 ∧ -b^{1, 67}_0 ∧ true) 
c  in CNF:
c    -b^{1, 67}_2 ∨  b^{1, 67}_1 ∨  b^{1, 67}_0 ∨ false 
c  in DIMACS:
-1361  1362  1363  0

c  3 does not represent an automaton state.
c    -(-b^{1, 67}_2 ∧  b^{1, 67}_1 ∧  b^{1, 67}_0 ∧ true) 
c  in CNF:
c     b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ false 
c  in DIMACS:
 1361 -1362 -1363  0
c  -3 does not represent an automaton state.
c    -( b^{1, 67}_2 ∧  b^{1, 67}_1 ∧  b^{1, 67}_0 ∧ true) 
c  in CNF:
c    -b^{1, 67}_2 ∨ -b^{1, 67}_1 ∨ -b^{1, 67}_0 ∨ false 
c  in DIMACS:
-1361 -1362 -1363  0

c i = 68
c  -2+1 --> -1
c    ( b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧  p_68) -> ( b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0)
c  in CNF:
c    -b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨  b^{1, 69}_2
c    -b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_1
c    -b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨  b^{1, 69}_0
c  in DIMACS:
-1364 -1365  1366 -68  1367 0
-1364 -1365  1366 -68 -1368 0
-1364 -1365  1366 -68  1369 0

c  -1+1 --> 0
c    ( b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0 ∧  p_68) -> (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧ -b^{1, 69}_0)
c  in CNF:
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_2
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_1
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_0
c  in DIMACS:
-1364  1365 -1366 -68 -1367 0
-1364  1365 -1366 -68 -1368 0
-1364  1365 -1366 -68 -1369 0

c  0+1 --> 1
c    (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧  p_68) -> (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0)
c  in CNF:
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_2
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_1
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨  b^{1, 69}_0
c  in DIMACS:
 1364  1365  1366 -68 -1367 0
 1364  1365  1366 -68 -1368 0
 1364  1365  1366 -68  1369 0

c  1+1 --> 2
c    (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0 ∧  p_68) -> (-b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0)
c  in CNF:
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_2
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨  b^{1, 69}_1
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ -p_68 ∨ -b^{1, 69}_0
c  in DIMACS:
 1364  1365 -1366 -68 -1367 0
 1364  1365 -1366 -68  1368 0
 1364  1365 -1366 -68 -1369 0

c  2+1 --> break 
c    (-b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧  p_68) -> break
c  in CNF:
c     b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 1364 -1365  1366 -68 1162 0


c  2-1 --> 1
c    (-b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧ -p_68) -> (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0)
c  in CNF:
c     b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_2
c     b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_1
c     b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨  b^{1, 69}_0
c  in DIMACS:
 1364 -1365  1366  68 -1367 0
 1364 -1365  1366  68 -1368 0
 1364 -1365  1366  68  1369 0

c  1-1 --> 0
c    (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0 ∧ -p_68) -> (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧ -b^{1, 69}_0)
c  in CNF:
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_2
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_1
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_0
c  in DIMACS:
 1364  1365 -1366  68 -1367 0
 1364  1365 -1366  68 -1368 0
 1364  1365 -1366  68 -1369 0

c  0-1 --> -1
c    (-b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧ -p_68) -> ( b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0)
c  in CNF:
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨  b^{1, 69}_2
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_1
c     b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨  b^{1, 69}_0
c  in DIMACS:
 1364  1365  1366  68  1367 0
 1364  1365  1366  68 -1368 0
 1364  1365  1366  68  1369 0

c  -1-1 --> -2
c    ( b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧  b^{1, 68}_0 ∧ -p_68) -> ( b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0)
c  in CNF:
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨  b^{1, 69}_2
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨  b^{1, 69}_1
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨  p_68 ∨ -b^{1, 69}_0
c  in DIMACS:
-1364  1365 -1366  68  1367 0
-1364  1365 -1366  68  1368 0
-1364  1365 -1366  68 -1369 0

c  -2-1 --> break 
c    ( b^{1, 68}_2 ∧  b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨  b^{1, 68}_0 ∨  p_68 ∨ break
c  in DIMACS:
-1364 -1365  1366  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 68}_2 ∧ -b^{1, 68}_1 ∧ -b^{1, 68}_0 ∧ true) 
c  in CNF:
c    -b^{1, 68}_2 ∨  b^{1, 68}_1 ∨  b^{1, 68}_0 ∨ false 
c  in DIMACS:
-1364  1365  1366  0

c  3 does not represent an automaton state.
c    -(-b^{1, 68}_2 ∧  b^{1, 68}_1 ∧  b^{1, 68}_0 ∧ true) 
c  in CNF:
c     b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ false 
c  in DIMACS:
 1364 -1365 -1366  0
c  -3 does not represent an automaton state.
c    -( b^{1, 68}_2 ∧  b^{1, 68}_1 ∧  b^{1, 68}_0 ∧ true) 
c  in CNF:
c    -b^{1, 68}_2 ∨ -b^{1, 68}_1 ∨ -b^{1, 68}_0 ∨ false 
c  in DIMACS:
-1364 -1365 -1366  0

c i = 69
c  -2+1 --> -1
c    ( b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧  p_69) -> ( b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0)
c  in CNF:
c    -b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨  b^{1, 70}_2
c    -b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_1
c    -b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨  b^{1, 70}_0
c  in DIMACS:
-1367 -1368  1369 -69  1370 0
-1367 -1368  1369 -69 -1371 0
-1367 -1368  1369 -69  1372 0

c  -1+1 --> 0
c    ( b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0 ∧  p_69) -> (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧ -b^{1, 70}_0)
c  in CNF:
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_2
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_1
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_0
c  in DIMACS:
-1367  1368 -1369 -69 -1370 0
-1367  1368 -1369 -69 -1371 0
-1367  1368 -1369 -69 -1372 0

c  0+1 --> 1
c    (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧  p_69) -> (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0)
c  in CNF:
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_2
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_1
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨  b^{1, 70}_0
c  in DIMACS:
 1367  1368  1369 -69 -1370 0
 1367  1368  1369 -69 -1371 0
 1367  1368  1369 -69  1372 0

c  1+1 --> 2
c    (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0 ∧  p_69) -> (-b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0)
c  in CNF:
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_2
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨  b^{1, 70}_1
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ -p_69 ∨ -b^{1, 70}_0
c  in DIMACS:
 1367  1368 -1369 -69 -1370 0
 1367  1368 -1369 -69  1371 0
 1367  1368 -1369 -69 -1372 0

c  2+1 --> break 
c    (-b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧  p_69) -> break
c  in CNF:
c     b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ -p_69 ∨ break
c  in DIMACS:
 1367 -1368  1369 -69 1162 0


c  2-1 --> 1
c    (-b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧ -p_69) -> (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0)
c  in CNF:
c     b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_2
c     b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_1
c     b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨  b^{1, 70}_0
c  in DIMACS:
 1367 -1368  1369  69 -1370 0
 1367 -1368  1369  69 -1371 0
 1367 -1368  1369  69  1372 0

c  1-1 --> 0
c    (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0 ∧ -p_69) -> (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧ -b^{1, 70}_0)
c  in CNF:
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_2
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_1
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_0
c  in DIMACS:
 1367  1368 -1369  69 -1370 0
 1367  1368 -1369  69 -1371 0
 1367  1368 -1369  69 -1372 0

c  0-1 --> -1
c    (-b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧ -p_69) -> ( b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0)
c  in CNF:
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨  b^{1, 70}_2
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_1
c     b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨  b^{1, 70}_0
c  in DIMACS:
 1367  1368  1369  69  1370 0
 1367  1368  1369  69 -1371 0
 1367  1368  1369  69  1372 0

c  -1-1 --> -2
c    ( b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧  b^{1, 69}_0 ∧ -p_69) -> ( b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0)
c  in CNF:
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨  b^{1, 70}_2
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨  b^{1, 70}_1
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨  p_69 ∨ -b^{1, 70}_0
c  in DIMACS:
-1367  1368 -1369  69  1370 0
-1367  1368 -1369  69  1371 0
-1367  1368 -1369  69 -1372 0

c  -2-1 --> break 
c    ( b^{1, 69}_2 ∧  b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧ -p_69) -> break
c  in CNF:
c    -b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨  b^{1, 69}_0 ∨  p_69 ∨ break
c  in DIMACS:
-1367 -1368  1369  69 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 69}_2 ∧ -b^{1, 69}_1 ∧ -b^{1, 69}_0 ∧ true) 
c  in CNF:
c    -b^{1, 69}_2 ∨  b^{1, 69}_1 ∨  b^{1, 69}_0 ∨ false 
c  in DIMACS:
-1367  1368  1369  0

c  3 does not represent an automaton state.
c    -(-b^{1, 69}_2 ∧  b^{1, 69}_1 ∧  b^{1, 69}_0 ∧ true) 
c  in CNF:
c     b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ false 
c  in DIMACS:
 1367 -1368 -1369  0
c  -3 does not represent an automaton state.
c    -( b^{1, 69}_2 ∧  b^{1, 69}_1 ∧  b^{1, 69}_0 ∧ true) 
c  in CNF:
c    -b^{1, 69}_2 ∨ -b^{1, 69}_1 ∨ -b^{1, 69}_0 ∨ false 
c  in DIMACS:
-1367 -1368 -1369  0

c i = 70
c  -2+1 --> -1
c    ( b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧  p_70) -> ( b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0)
c  in CNF:
c    -b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨  b^{1, 71}_2
c    -b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_1
c    -b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨  b^{1, 71}_0
c  in DIMACS:
-1370 -1371  1372 -70  1373 0
-1370 -1371  1372 -70 -1374 0
-1370 -1371  1372 -70  1375 0

c  -1+1 --> 0
c    ( b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0 ∧  p_70) -> (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧ -b^{1, 71}_0)
c  in CNF:
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_2
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_1
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_0
c  in DIMACS:
-1370  1371 -1372 -70 -1373 0
-1370  1371 -1372 -70 -1374 0
-1370  1371 -1372 -70 -1375 0

c  0+1 --> 1
c    (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧  p_70) -> (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0)
c  in CNF:
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_2
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_1
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨  b^{1, 71}_0
c  in DIMACS:
 1370  1371  1372 -70 -1373 0
 1370  1371  1372 -70 -1374 0
 1370  1371  1372 -70  1375 0

c  1+1 --> 2
c    (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0 ∧  p_70) -> (-b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0)
c  in CNF:
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_2
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨  b^{1, 71}_1
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ -p_70 ∨ -b^{1, 71}_0
c  in DIMACS:
 1370  1371 -1372 -70 -1373 0
 1370  1371 -1372 -70  1374 0
 1370  1371 -1372 -70 -1375 0

c  2+1 --> break 
c    (-b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧  p_70) -> break
c  in CNF:
c     b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 1370 -1371  1372 -70 1162 0


c  2-1 --> 1
c    (-b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧ -p_70) -> (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0)
c  in CNF:
c     b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_2
c     b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_1
c     b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨  b^{1, 71}_0
c  in DIMACS:
 1370 -1371  1372  70 -1373 0
 1370 -1371  1372  70 -1374 0
 1370 -1371  1372  70  1375 0

c  1-1 --> 0
c    (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0 ∧ -p_70) -> (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧ -b^{1, 71}_0)
c  in CNF:
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_2
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_1
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_0
c  in DIMACS:
 1370  1371 -1372  70 -1373 0
 1370  1371 -1372  70 -1374 0
 1370  1371 -1372  70 -1375 0

c  0-1 --> -1
c    (-b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧ -p_70) -> ( b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0)
c  in CNF:
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨  b^{1, 71}_2
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_1
c     b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨  b^{1, 71}_0
c  in DIMACS:
 1370  1371  1372  70  1373 0
 1370  1371  1372  70 -1374 0
 1370  1371  1372  70  1375 0

c  -1-1 --> -2
c    ( b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧  b^{1, 70}_0 ∧ -p_70) -> ( b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0)
c  in CNF:
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨  b^{1, 71}_2
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨  b^{1, 71}_1
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨  p_70 ∨ -b^{1, 71}_0
c  in DIMACS:
-1370  1371 -1372  70  1373 0
-1370  1371 -1372  70  1374 0
-1370  1371 -1372  70 -1375 0

c  -2-1 --> break 
c    ( b^{1, 70}_2 ∧  b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨  b^{1, 70}_0 ∨  p_70 ∨ break
c  in DIMACS:
-1370 -1371  1372  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 70}_2 ∧ -b^{1, 70}_1 ∧ -b^{1, 70}_0 ∧ true) 
c  in CNF:
c    -b^{1, 70}_2 ∨  b^{1, 70}_1 ∨  b^{1, 70}_0 ∨ false 
c  in DIMACS:
-1370  1371  1372  0

c  3 does not represent an automaton state.
c    -(-b^{1, 70}_2 ∧  b^{1, 70}_1 ∧  b^{1, 70}_0 ∧ true) 
c  in CNF:
c     b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ false 
c  in DIMACS:
 1370 -1371 -1372  0
c  -3 does not represent an automaton state.
c    -( b^{1, 70}_2 ∧  b^{1, 70}_1 ∧  b^{1, 70}_0 ∧ true) 
c  in CNF:
c    -b^{1, 70}_2 ∨ -b^{1, 70}_1 ∨ -b^{1, 70}_0 ∨ false 
c  in DIMACS:
-1370 -1371 -1372  0

c i = 71
c  -2+1 --> -1
c    ( b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧  p_71) -> ( b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0)
c  in CNF:
c    -b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨  b^{1, 72}_2
c    -b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_1
c    -b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨  b^{1, 72}_0
c  in DIMACS:
-1373 -1374  1375 -71  1376 0
-1373 -1374  1375 -71 -1377 0
-1373 -1374  1375 -71  1378 0

c  -1+1 --> 0
c    ( b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0 ∧  p_71) -> (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧ -b^{1, 72}_0)
c  in CNF:
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_2
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_1
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_0
c  in DIMACS:
-1373  1374 -1375 -71 -1376 0
-1373  1374 -1375 -71 -1377 0
-1373  1374 -1375 -71 -1378 0

c  0+1 --> 1
c    (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧  p_71) -> (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0)
c  in CNF:
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_2
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_1
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨  b^{1, 72}_0
c  in DIMACS:
 1373  1374  1375 -71 -1376 0
 1373  1374  1375 -71 -1377 0
 1373  1374  1375 -71  1378 0

c  1+1 --> 2
c    (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0 ∧  p_71) -> (-b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0)
c  in CNF:
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_2
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨  b^{1, 72}_1
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ -p_71 ∨ -b^{1, 72}_0
c  in DIMACS:
 1373  1374 -1375 -71 -1376 0
 1373  1374 -1375 -71  1377 0
 1373  1374 -1375 -71 -1378 0

c  2+1 --> break 
c    (-b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧  p_71) -> break
c  in CNF:
c     b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ -p_71 ∨ break
c  in DIMACS:
 1373 -1374  1375 -71 1162 0


c  2-1 --> 1
c    (-b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧ -p_71) -> (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0)
c  in CNF:
c     b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_2
c     b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_1
c     b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨  b^{1, 72}_0
c  in DIMACS:
 1373 -1374  1375  71 -1376 0
 1373 -1374  1375  71 -1377 0
 1373 -1374  1375  71  1378 0

c  1-1 --> 0
c    (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0 ∧ -p_71) -> (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧ -b^{1, 72}_0)
c  in CNF:
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_2
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_1
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_0
c  in DIMACS:
 1373  1374 -1375  71 -1376 0
 1373  1374 -1375  71 -1377 0
 1373  1374 -1375  71 -1378 0

c  0-1 --> -1
c    (-b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧ -p_71) -> ( b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0)
c  in CNF:
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨  b^{1, 72}_2
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_1
c     b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨  b^{1, 72}_0
c  in DIMACS:
 1373  1374  1375  71  1376 0
 1373  1374  1375  71 -1377 0
 1373  1374  1375  71  1378 0

c  -1-1 --> -2
c    ( b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧  b^{1, 71}_0 ∧ -p_71) -> ( b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0)
c  in CNF:
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨  b^{1, 72}_2
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨  b^{1, 72}_1
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨  p_71 ∨ -b^{1, 72}_0
c  in DIMACS:
-1373  1374 -1375  71  1376 0
-1373  1374 -1375  71  1377 0
-1373  1374 -1375  71 -1378 0

c  -2-1 --> break 
c    ( b^{1, 71}_2 ∧  b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧ -p_71) -> break
c  in CNF:
c    -b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨  b^{1, 71}_0 ∨  p_71 ∨ break
c  in DIMACS:
-1373 -1374  1375  71 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 71}_2 ∧ -b^{1, 71}_1 ∧ -b^{1, 71}_0 ∧ true) 
c  in CNF:
c    -b^{1, 71}_2 ∨  b^{1, 71}_1 ∨  b^{1, 71}_0 ∨ false 
c  in DIMACS:
-1373  1374  1375  0

c  3 does not represent an automaton state.
c    -(-b^{1, 71}_2 ∧  b^{1, 71}_1 ∧  b^{1, 71}_0 ∧ true) 
c  in CNF:
c     b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ false 
c  in DIMACS:
 1373 -1374 -1375  0
c  -3 does not represent an automaton state.
c    -( b^{1, 71}_2 ∧  b^{1, 71}_1 ∧  b^{1, 71}_0 ∧ true) 
c  in CNF:
c    -b^{1, 71}_2 ∨ -b^{1, 71}_1 ∨ -b^{1, 71}_0 ∨ false 
c  in DIMACS:
-1373 -1374 -1375  0

c i = 72
c  -2+1 --> -1
c    ( b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧  p_72) -> ( b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0)
c  in CNF:
c    -b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨  b^{1, 73}_2
c    -b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_1
c    -b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨  b^{1, 73}_0
c  in DIMACS:
-1376 -1377  1378 -72  1379 0
-1376 -1377  1378 -72 -1380 0
-1376 -1377  1378 -72  1381 0

c  -1+1 --> 0
c    ( b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0 ∧  p_72) -> (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧ -b^{1, 73}_0)
c  in CNF:
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_2
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_1
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_0
c  in DIMACS:
-1376  1377 -1378 -72 -1379 0
-1376  1377 -1378 -72 -1380 0
-1376  1377 -1378 -72 -1381 0

c  0+1 --> 1
c    (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧  p_72) -> (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0)
c  in CNF:
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_2
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_1
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨  b^{1, 73}_0
c  in DIMACS:
 1376  1377  1378 -72 -1379 0
 1376  1377  1378 -72 -1380 0
 1376  1377  1378 -72  1381 0

c  1+1 --> 2
c    (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0 ∧  p_72) -> (-b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0)
c  in CNF:
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_2
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨  b^{1, 73}_1
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ -p_72 ∨ -b^{1, 73}_0
c  in DIMACS:
 1376  1377 -1378 -72 -1379 0
 1376  1377 -1378 -72  1380 0
 1376  1377 -1378 -72 -1381 0

c  2+1 --> break 
c    (-b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧  p_72) -> break
c  in CNF:
c     b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 1376 -1377  1378 -72 1162 0


c  2-1 --> 1
c    (-b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧ -p_72) -> (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0)
c  in CNF:
c     b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_2
c     b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_1
c     b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨  b^{1, 73}_0
c  in DIMACS:
 1376 -1377  1378  72 -1379 0
 1376 -1377  1378  72 -1380 0
 1376 -1377  1378  72  1381 0

c  1-1 --> 0
c    (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0 ∧ -p_72) -> (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧ -b^{1, 73}_0)
c  in CNF:
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_2
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_1
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_0
c  in DIMACS:
 1376  1377 -1378  72 -1379 0
 1376  1377 -1378  72 -1380 0
 1376  1377 -1378  72 -1381 0

c  0-1 --> -1
c    (-b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧ -p_72) -> ( b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0)
c  in CNF:
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨  b^{1, 73}_2
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_1
c     b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨  b^{1, 73}_0
c  in DIMACS:
 1376  1377  1378  72  1379 0
 1376  1377  1378  72 -1380 0
 1376  1377  1378  72  1381 0

c  -1-1 --> -2
c    ( b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧  b^{1, 72}_0 ∧ -p_72) -> ( b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0)
c  in CNF:
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨  b^{1, 73}_2
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨  b^{1, 73}_1
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨  p_72 ∨ -b^{1, 73}_0
c  in DIMACS:
-1376  1377 -1378  72  1379 0
-1376  1377 -1378  72  1380 0
-1376  1377 -1378  72 -1381 0

c  -2-1 --> break 
c    ( b^{1, 72}_2 ∧  b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨  b^{1, 72}_0 ∨  p_72 ∨ break
c  in DIMACS:
-1376 -1377  1378  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 72}_2 ∧ -b^{1, 72}_1 ∧ -b^{1, 72}_0 ∧ true) 
c  in CNF:
c    -b^{1, 72}_2 ∨  b^{1, 72}_1 ∨  b^{1, 72}_0 ∨ false 
c  in DIMACS:
-1376  1377  1378  0

c  3 does not represent an automaton state.
c    -(-b^{1, 72}_2 ∧  b^{1, 72}_1 ∧  b^{1, 72}_0 ∧ true) 
c  in CNF:
c     b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ false 
c  in DIMACS:
 1376 -1377 -1378  0
c  -3 does not represent an automaton state.
c    -( b^{1, 72}_2 ∧  b^{1, 72}_1 ∧  b^{1, 72}_0 ∧ true) 
c  in CNF:
c    -b^{1, 72}_2 ∨ -b^{1, 72}_1 ∨ -b^{1, 72}_0 ∨ false 
c  in DIMACS:
-1376 -1377 -1378  0

c i = 73
c  -2+1 --> -1
c    ( b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧  p_73) -> ( b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0)
c  in CNF:
c    -b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨  b^{1, 74}_2
c    -b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_1
c    -b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨  b^{1, 74}_0
c  in DIMACS:
-1379 -1380  1381 -73  1382 0
-1379 -1380  1381 -73 -1383 0
-1379 -1380  1381 -73  1384 0

c  -1+1 --> 0
c    ( b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0 ∧  p_73) -> (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧ -b^{1, 74}_0)
c  in CNF:
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_2
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_1
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_0
c  in DIMACS:
-1379  1380 -1381 -73 -1382 0
-1379  1380 -1381 -73 -1383 0
-1379  1380 -1381 -73 -1384 0

c  0+1 --> 1
c    (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧  p_73) -> (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0)
c  in CNF:
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_2
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_1
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨  b^{1, 74}_0
c  in DIMACS:
 1379  1380  1381 -73 -1382 0
 1379  1380  1381 -73 -1383 0
 1379  1380  1381 -73  1384 0

c  1+1 --> 2
c    (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0 ∧  p_73) -> (-b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0)
c  in CNF:
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_2
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨  b^{1, 74}_1
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ -p_73 ∨ -b^{1, 74}_0
c  in DIMACS:
 1379  1380 -1381 -73 -1382 0
 1379  1380 -1381 -73  1383 0
 1379  1380 -1381 -73 -1384 0

c  2+1 --> break 
c    (-b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧  p_73) -> break
c  in CNF:
c     b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ -p_73 ∨ break
c  in DIMACS:
 1379 -1380  1381 -73 1162 0


c  2-1 --> 1
c    (-b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧ -p_73) -> (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0)
c  in CNF:
c     b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_2
c     b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_1
c     b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨  b^{1, 74}_0
c  in DIMACS:
 1379 -1380  1381  73 -1382 0
 1379 -1380  1381  73 -1383 0
 1379 -1380  1381  73  1384 0

c  1-1 --> 0
c    (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0 ∧ -p_73) -> (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧ -b^{1, 74}_0)
c  in CNF:
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_2
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_1
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_0
c  in DIMACS:
 1379  1380 -1381  73 -1382 0
 1379  1380 -1381  73 -1383 0
 1379  1380 -1381  73 -1384 0

c  0-1 --> -1
c    (-b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧ -p_73) -> ( b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0)
c  in CNF:
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨  b^{1, 74}_2
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_1
c     b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨  b^{1, 74}_0
c  in DIMACS:
 1379  1380  1381  73  1382 0
 1379  1380  1381  73 -1383 0
 1379  1380  1381  73  1384 0

c  -1-1 --> -2
c    ( b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧  b^{1, 73}_0 ∧ -p_73) -> ( b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0)
c  in CNF:
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨  b^{1, 74}_2
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨  b^{1, 74}_1
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨  p_73 ∨ -b^{1, 74}_0
c  in DIMACS:
-1379  1380 -1381  73  1382 0
-1379  1380 -1381  73  1383 0
-1379  1380 -1381  73 -1384 0

c  -2-1 --> break 
c    ( b^{1, 73}_2 ∧  b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧ -p_73) -> break
c  in CNF:
c    -b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨  b^{1, 73}_0 ∨  p_73 ∨ break
c  in DIMACS:
-1379 -1380  1381  73 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 73}_2 ∧ -b^{1, 73}_1 ∧ -b^{1, 73}_0 ∧ true) 
c  in CNF:
c    -b^{1, 73}_2 ∨  b^{1, 73}_1 ∨  b^{1, 73}_0 ∨ false 
c  in DIMACS:
-1379  1380  1381  0

c  3 does not represent an automaton state.
c    -(-b^{1, 73}_2 ∧  b^{1, 73}_1 ∧  b^{1, 73}_0 ∧ true) 
c  in CNF:
c     b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ false 
c  in DIMACS:
 1379 -1380 -1381  0
c  -3 does not represent an automaton state.
c    -( b^{1, 73}_2 ∧  b^{1, 73}_1 ∧  b^{1, 73}_0 ∧ true) 
c  in CNF:
c    -b^{1, 73}_2 ∨ -b^{1, 73}_1 ∨ -b^{1, 73}_0 ∨ false 
c  in DIMACS:
-1379 -1380 -1381  0

c i = 74
c  -2+1 --> -1
c    ( b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧  p_74) -> ( b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0)
c  in CNF:
c    -b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨  b^{1, 75}_2
c    -b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_1
c    -b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨  b^{1, 75}_0
c  in DIMACS:
-1382 -1383  1384 -74  1385 0
-1382 -1383  1384 -74 -1386 0
-1382 -1383  1384 -74  1387 0

c  -1+1 --> 0
c    ( b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0 ∧  p_74) -> (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧ -b^{1, 75}_0)
c  in CNF:
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_2
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_1
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_0
c  in DIMACS:
-1382  1383 -1384 -74 -1385 0
-1382  1383 -1384 -74 -1386 0
-1382  1383 -1384 -74 -1387 0

c  0+1 --> 1
c    (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧  p_74) -> (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0)
c  in CNF:
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_2
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_1
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨  b^{1, 75}_0
c  in DIMACS:
 1382  1383  1384 -74 -1385 0
 1382  1383  1384 -74 -1386 0
 1382  1383  1384 -74  1387 0

c  1+1 --> 2
c    (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0 ∧  p_74) -> (-b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0)
c  in CNF:
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_2
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨  b^{1, 75}_1
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ -p_74 ∨ -b^{1, 75}_0
c  in DIMACS:
 1382  1383 -1384 -74 -1385 0
 1382  1383 -1384 -74  1386 0
 1382  1383 -1384 -74 -1387 0

c  2+1 --> break 
c    (-b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧  p_74) -> break
c  in CNF:
c     b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ -p_74 ∨ break
c  in DIMACS:
 1382 -1383  1384 -74 1162 0


c  2-1 --> 1
c    (-b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧ -p_74) -> (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0)
c  in CNF:
c     b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_2
c     b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_1
c     b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨  b^{1, 75}_0
c  in DIMACS:
 1382 -1383  1384  74 -1385 0
 1382 -1383  1384  74 -1386 0
 1382 -1383  1384  74  1387 0

c  1-1 --> 0
c    (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0 ∧ -p_74) -> (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧ -b^{1, 75}_0)
c  in CNF:
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_2
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_1
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_0
c  in DIMACS:
 1382  1383 -1384  74 -1385 0
 1382  1383 -1384  74 -1386 0
 1382  1383 -1384  74 -1387 0

c  0-1 --> -1
c    (-b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧ -p_74) -> ( b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0)
c  in CNF:
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨  b^{1, 75}_2
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_1
c     b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨  b^{1, 75}_0
c  in DIMACS:
 1382  1383  1384  74  1385 0
 1382  1383  1384  74 -1386 0
 1382  1383  1384  74  1387 0

c  -1-1 --> -2
c    ( b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧  b^{1, 74}_0 ∧ -p_74) -> ( b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0)
c  in CNF:
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨  b^{1, 75}_2
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨  b^{1, 75}_1
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨  p_74 ∨ -b^{1, 75}_0
c  in DIMACS:
-1382  1383 -1384  74  1385 0
-1382  1383 -1384  74  1386 0
-1382  1383 -1384  74 -1387 0

c  -2-1 --> break 
c    ( b^{1, 74}_2 ∧  b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧ -p_74) -> break
c  in CNF:
c    -b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨  b^{1, 74}_0 ∨  p_74 ∨ break
c  in DIMACS:
-1382 -1383  1384  74 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 74}_2 ∧ -b^{1, 74}_1 ∧ -b^{1, 74}_0 ∧ true) 
c  in CNF:
c    -b^{1, 74}_2 ∨  b^{1, 74}_1 ∨  b^{1, 74}_0 ∨ false 
c  in DIMACS:
-1382  1383  1384  0

c  3 does not represent an automaton state.
c    -(-b^{1, 74}_2 ∧  b^{1, 74}_1 ∧  b^{1, 74}_0 ∧ true) 
c  in CNF:
c     b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ false 
c  in DIMACS:
 1382 -1383 -1384  0
c  -3 does not represent an automaton state.
c    -( b^{1, 74}_2 ∧  b^{1, 74}_1 ∧  b^{1, 74}_0 ∧ true) 
c  in CNF:
c    -b^{1, 74}_2 ∨ -b^{1, 74}_1 ∨ -b^{1, 74}_0 ∨ false 
c  in DIMACS:
-1382 -1383 -1384  0

c i = 75
c  -2+1 --> -1
c    ( b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧  p_75) -> ( b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0)
c  in CNF:
c    -b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨  b^{1, 76}_2
c    -b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_1
c    -b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨  b^{1, 76}_0
c  in DIMACS:
-1385 -1386  1387 -75  1388 0
-1385 -1386  1387 -75 -1389 0
-1385 -1386  1387 -75  1390 0

c  -1+1 --> 0
c    ( b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0 ∧  p_75) -> (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧ -b^{1, 76}_0)
c  in CNF:
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_2
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_1
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_0
c  in DIMACS:
-1385  1386 -1387 -75 -1388 0
-1385  1386 -1387 -75 -1389 0
-1385  1386 -1387 -75 -1390 0

c  0+1 --> 1
c    (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧  p_75) -> (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0)
c  in CNF:
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_2
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_1
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨  b^{1, 76}_0
c  in DIMACS:
 1385  1386  1387 -75 -1388 0
 1385  1386  1387 -75 -1389 0
 1385  1386  1387 -75  1390 0

c  1+1 --> 2
c    (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0 ∧  p_75) -> (-b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0)
c  in CNF:
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_2
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨  b^{1, 76}_1
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ -p_75 ∨ -b^{1, 76}_0
c  in DIMACS:
 1385  1386 -1387 -75 -1388 0
 1385  1386 -1387 -75  1389 0
 1385  1386 -1387 -75 -1390 0

c  2+1 --> break 
c    (-b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧  p_75) -> break
c  in CNF:
c     b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 1385 -1386  1387 -75 1162 0


c  2-1 --> 1
c    (-b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧ -p_75) -> (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0)
c  in CNF:
c     b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_2
c     b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_1
c     b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨  b^{1, 76}_0
c  in DIMACS:
 1385 -1386  1387  75 -1388 0
 1385 -1386  1387  75 -1389 0
 1385 -1386  1387  75  1390 0

c  1-1 --> 0
c    (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0 ∧ -p_75) -> (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧ -b^{1, 76}_0)
c  in CNF:
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_2
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_1
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_0
c  in DIMACS:
 1385  1386 -1387  75 -1388 0
 1385  1386 -1387  75 -1389 0
 1385  1386 -1387  75 -1390 0

c  0-1 --> -1
c    (-b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧ -p_75) -> ( b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0)
c  in CNF:
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨  b^{1, 76}_2
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_1
c     b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨  b^{1, 76}_0
c  in DIMACS:
 1385  1386  1387  75  1388 0
 1385  1386  1387  75 -1389 0
 1385  1386  1387  75  1390 0

c  -1-1 --> -2
c    ( b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧  b^{1, 75}_0 ∧ -p_75) -> ( b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0)
c  in CNF:
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨  b^{1, 76}_2
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨  b^{1, 76}_1
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨  p_75 ∨ -b^{1, 76}_0
c  in DIMACS:
-1385  1386 -1387  75  1388 0
-1385  1386 -1387  75  1389 0
-1385  1386 -1387  75 -1390 0

c  -2-1 --> break 
c    ( b^{1, 75}_2 ∧  b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨  b^{1, 75}_0 ∨  p_75 ∨ break
c  in DIMACS:
-1385 -1386  1387  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 75}_2 ∧ -b^{1, 75}_1 ∧ -b^{1, 75}_0 ∧ true) 
c  in CNF:
c    -b^{1, 75}_2 ∨  b^{1, 75}_1 ∨  b^{1, 75}_0 ∨ false 
c  in DIMACS:
-1385  1386  1387  0

c  3 does not represent an automaton state.
c    -(-b^{1, 75}_2 ∧  b^{1, 75}_1 ∧  b^{1, 75}_0 ∧ true) 
c  in CNF:
c     b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ false 
c  in DIMACS:
 1385 -1386 -1387  0
c  -3 does not represent an automaton state.
c    -( b^{1, 75}_2 ∧  b^{1, 75}_1 ∧  b^{1, 75}_0 ∧ true) 
c  in CNF:
c    -b^{1, 75}_2 ∨ -b^{1, 75}_1 ∨ -b^{1, 75}_0 ∨ false 
c  in DIMACS:
-1385 -1386 -1387  0

c i = 76
c  -2+1 --> -1
c    ( b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧  p_76) -> ( b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0)
c  in CNF:
c    -b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨  b^{1, 77}_2
c    -b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_1
c    -b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨  b^{1, 77}_0
c  in DIMACS:
-1388 -1389  1390 -76  1391 0
-1388 -1389  1390 -76 -1392 0
-1388 -1389  1390 -76  1393 0

c  -1+1 --> 0
c    ( b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0 ∧  p_76) -> (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧ -b^{1, 77}_0)
c  in CNF:
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_2
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_1
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_0
c  in DIMACS:
-1388  1389 -1390 -76 -1391 0
-1388  1389 -1390 -76 -1392 0
-1388  1389 -1390 -76 -1393 0

c  0+1 --> 1
c    (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧  p_76) -> (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0)
c  in CNF:
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_2
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_1
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨  b^{1, 77}_0
c  in DIMACS:
 1388  1389  1390 -76 -1391 0
 1388  1389  1390 -76 -1392 0
 1388  1389  1390 -76  1393 0

c  1+1 --> 2
c    (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0 ∧  p_76) -> (-b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0)
c  in CNF:
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_2
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨  b^{1, 77}_1
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ -p_76 ∨ -b^{1, 77}_0
c  in DIMACS:
 1388  1389 -1390 -76 -1391 0
 1388  1389 -1390 -76  1392 0
 1388  1389 -1390 -76 -1393 0

c  2+1 --> break 
c    (-b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧  p_76) -> break
c  in CNF:
c     b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 1388 -1389  1390 -76 1162 0


c  2-1 --> 1
c    (-b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧ -p_76) -> (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0)
c  in CNF:
c     b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_2
c     b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_1
c     b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨  b^{1, 77}_0
c  in DIMACS:
 1388 -1389  1390  76 -1391 0
 1388 -1389  1390  76 -1392 0
 1388 -1389  1390  76  1393 0

c  1-1 --> 0
c    (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0 ∧ -p_76) -> (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧ -b^{1, 77}_0)
c  in CNF:
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_2
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_1
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_0
c  in DIMACS:
 1388  1389 -1390  76 -1391 0
 1388  1389 -1390  76 -1392 0
 1388  1389 -1390  76 -1393 0

c  0-1 --> -1
c    (-b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧ -p_76) -> ( b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0)
c  in CNF:
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨  b^{1, 77}_2
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_1
c     b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨  b^{1, 77}_0
c  in DIMACS:
 1388  1389  1390  76  1391 0
 1388  1389  1390  76 -1392 0
 1388  1389  1390  76  1393 0

c  -1-1 --> -2
c    ( b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧  b^{1, 76}_0 ∧ -p_76) -> ( b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0)
c  in CNF:
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨  b^{1, 77}_2
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨  b^{1, 77}_1
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨  p_76 ∨ -b^{1, 77}_0
c  in DIMACS:
-1388  1389 -1390  76  1391 0
-1388  1389 -1390  76  1392 0
-1388  1389 -1390  76 -1393 0

c  -2-1 --> break 
c    ( b^{1, 76}_2 ∧  b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨  b^{1, 76}_0 ∨  p_76 ∨ break
c  in DIMACS:
-1388 -1389  1390  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 76}_2 ∧ -b^{1, 76}_1 ∧ -b^{1, 76}_0 ∧ true) 
c  in CNF:
c    -b^{1, 76}_2 ∨  b^{1, 76}_1 ∨  b^{1, 76}_0 ∨ false 
c  in DIMACS:
-1388  1389  1390  0

c  3 does not represent an automaton state.
c    -(-b^{1, 76}_2 ∧  b^{1, 76}_1 ∧  b^{1, 76}_0 ∧ true) 
c  in CNF:
c     b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ false 
c  in DIMACS:
 1388 -1389 -1390  0
c  -3 does not represent an automaton state.
c    -( b^{1, 76}_2 ∧  b^{1, 76}_1 ∧  b^{1, 76}_0 ∧ true) 
c  in CNF:
c    -b^{1, 76}_2 ∨ -b^{1, 76}_1 ∨ -b^{1, 76}_0 ∨ false 
c  in DIMACS:
-1388 -1389 -1390  0

c i = 77
c  -2+1 --> -1
c    ( b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧  p_77) -> ( b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0)
c  in CNF:
c    -b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨  b^{1, 78}_2
c    -b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_1
c    -b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨  b^{1, 78}_0
c  in DIMACS:
-1391 -1392  1393 -77  1394 0
-1391 -1392  1393 -77 -1395 0
-1391 -1392  1393 -77  1396 0

c  -1+1 --> 0
c    ( b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0 ∧  p_77) -> (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧ -b^{1, 78}_0)
c  in CNF:
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_2
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_1
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_0
c  in DIMACS:
-1391  1392 -1393 -77 -1394 0
-1391  1392 -1393 -77 -1395 0
-1391  1392 -1393 -77 -1396 0

c  0+1 --> 1
c    (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧  p_77) -> (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0)
c  in CNF:
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_2
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_1
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨  b^{1, 78}_0
c  in DIMACS:
 1391  1392  1393 -77 -1394 0
 1391  1392  1393 -77 -1395 0
 1391  1392  1393 -77  1396 0

c  1+1 --> 2
c    (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0 ∧  p_77) -> (-b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0)
c  in CNF:
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_2
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨  b^{1, 78}_1
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ -p_77 ∨ -b^{1, 78}_0
c  in DIMACS:
 1391  1392 -1393 -77 -1394 0
 1391  1392 -1393 -77  1395 0
 1391  1392 -1393 -77 -1396 0

c  2+1 --> break 
c    (-b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧  p_77) -> break
c  in CNF:
c     b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ -p_77 ∨ break
c  in DIMACS:
 1391 -1392  1393 -77 1162 0


c  2-1 --> 1
c    (-b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧ -p_77) -> (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0)
c  in CNF:
c     b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_2
c     b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_1
c     b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨  b^{1, 78}_0
c  in DIMACS:
 1391 -1392  1393  77 -1394 0
 1391 -1392  1393  77 -1395 0
 1391 -1392  1393  77  1396 0

c  1-1 --> 0
c    (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0 ∧ -p_77) -> (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧ -b^{1, 78}_0)
c  in CNF:
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_2
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_1
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_0
c  in DIMACS:
 1391  1392 -1393  77 -1394 0
 1391  1392 -1393  77 -1395 0
 1391  1392 -1393  77 -1396 0

c  0-1 --> -1
c    (-b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧ -p_77) -> ( b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0)
c  in CNF:
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨  b^{1, 78}_2
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_1
c     b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨  b^{1, 78}_0
c  in DIMACS:
 1391  1392  1393  77  1394 0
 1391  1392  1393  77 -1395 0
 1391  1392  1393  77  1396 0

c  -1-1 --> -2
c    ( b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧  b^{1, 77}_0 ∧ -p_77) -> ( b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0)
c  in CNF:
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨  b^{1, 78}_2
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨  b^{1, 78}_1
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨  p_77 ∨ -b^{1, 78}_0
c  in DIMACS:
-1391  1392 -1393  77  1394 0
-1391  1392 -1393  77  1395 0
-1391  1392 -1393  77 -1396 0

c  -2-1 --> break 
c    ( b^{1, 77}_2 ∧  b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧ -p_77) -> break
c  in CNF:
c    -b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨  b^{1, 77}_0 ∨  p_77 ∨ break
c  in DIMACS:
-1391 -1392  1393  77 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 77}_2 ∧ -b^{1, 77}_1 ∧ -b^{1, 77}_0 ∧ true) 
c  in CNF:
c    -b^{1, 77}_2 ∨  b^{1, 77}_1 ∨  b^{1, 77}_0 ∨ false 
c  in DIMACS:
-1391  1392  1393  0

c  3 does not represent an automaton state.
c    -(-b^{1, 77}_2 ∧  b^{1, 77}_1 ∧  b^{1, 77}_0 ∧ true) 
c  in CNF:
c     b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ false 
c  in DIMACS:
 1391 -1392 -1393  0
c  -3 does not represent an automaton state.
c    -( b^{1, 77}_2 ∧  b^{1, 77}_1 ∧  b^{1, 77}_0 ∧ true) 
c  in CNF:
c    -b^{1, 77}_2 ∨ -b^{1, 77}_1 ∨ -b^{1, 77}_0 ∨ false 
c  in DIMACS:
-1391 -1392 -1393  0

c i = 78
c  -2+1 --> -1
c    ( b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧  p_78) -> ( b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0)
c  in CNF:
c    -b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨  b^{1, 79}_2
c    -b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_1
c    -b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨  b^{1, 79}_0
c  in DIMACS:
-1394 -1395  1396 -78  1397 0
-1394 -1395  1396 -78 -1398 0
-1394 -1395  1396 -78  1399 0

c  -1+1 --> 0
c    ( b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0 ∧  p_78) -> (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧ -b^{1, 79}_0)
c  in CNF:
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_2
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_1
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_0
c  in DIMACS:
-1394  1395 -1396 -78 -1397 0
-1394  1395 -1396 -78 -1398 0
-1394  1395 -1396 -78 -1399 0

c  0+1 --> 1
c    (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧  p_78) -> (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0)
c  in CNF:
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_2
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_1
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨  b^{1, 79}_0
c  in DIMACS:
 1394  1395  1396 -78 -1397 0
 1394  1395  1396 -78 -1398 0
 1394  1395  1396 -78  1399 0

c  1+1 --> 2
c    (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0 ∧  p_78) -> (-b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0)
c  in CNF:
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_2
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨  b^{1, 79}_1
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ -p_78 ∨ -b^{1, 79}_0
c  in DIMACS:
 1394  1395 -1396 -78 -1397 0
 1394  1395 -1396 -78  1398 0
 1394  1395 -1396 -78 -1399 0

c  2+1 --> break 
c    (-b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧  p_78) -> break
c  in CNF:
c     b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 1394 -1395  1396 -78 1162 0


c  2-1 --> 1
c    (-b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧ -p_78) -> (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0)
c  in CNF:
c     b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_2
c     b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_1
c     b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨  b^{1, 79}_0
c  in DIMACS:
 1394 -1395  1396  78 -1397 0
 1394 -1395  1396  78 -1398 0
 1394 -1395  1396  78  1399 0

c  1-1 --> 0
c    (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0 ∧ -p_78) -> (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧ -b^{1, 79}_0)
c  in CNF:
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_2
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_1
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_0
c  in DIMACS:
 1394  1395 -1396  78 -1397 0
 1394  1395 -1396  78 -1398 0
 1394  1395 -1396  78 -1399 0

c  0-1 --> -1
c    (-b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧ -p_78) -> ( b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0)
c  in CNF:
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨  b^{1, 79}_2
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_1
c     b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨  b^{1, 79}_0
c  in DIMACS:
 1394  1395  1396  78  1397 0
 1394  1395  1396  78 -1398 0
 1394  1395  1396  78  1399 0

c  -1-1 --> -2
c    ( b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧  b^{1, 78}_0 ∧ -p_78) -> ( b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0)
c  in CNF:
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨  b^{1, 79}_2
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨  b^{1, 79}_1
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨  p_78 ∨ -b^{1, 79}_0
c  in DIMACS:
-1394  1395 -1396  78  1397 0
-1394  1395 -1396  78  1398 0
-1394  1395 -1396  78 -1399 0

c  -2-1 --> break 
c    ( b^{1, 78}_2 ∧  b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨  b^{1, 78}_0 ∨  p_78 ∨ break
c  in DIMACS:
-1394 -1395  1396  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 78}_2 ∧ -b^{1, 78}_1 ∧ -b^{1, 78}_0 ∧ true) 
c  in CNF:
c    -b^{1, 78}_2 ∨  b^{1, 78}_1 ∨  b^{1, 78}_0 ∨ false 
c  in DIMACS:
-1394  1395  1396  0

c  3 does not represent an automaton state.
c    -(-b^{1, 78}_2 ∧  b^{1, 78}_1 ∧  b^{1, 78}_0 ∧ true) 
c  in CNF:
c     b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ false 
c  in DIMACS:
 1394 -1395 -1396  0
c  -3 does not represent an automaton state.
c    -( b^{1, 78}_2 ∧  b^{1, 78}_1 ∧  b^{1, 78}_0 ∧ true) 
c  in CNF:
c    -b^{1, 78}_2 ∨ -b^{1, 78}_1 ∨ -b^{1, 78}_0 ∨ false 
c  in DIMACS:
-1394 -1395 -1396  0

c i = 79
c  -2+1 --> -1
c    ( b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧  p_79) -> ( b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0)
c  in CNF:
c    -b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨  b^{1, 80}_2
c    -b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_1
c    -b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨  b^{1, 80}_0
c  in DIMACS:
-1397 -1398  1399 -79  1400 0
-1397 -1398  1399 -79 -1401 0
-1397 -1398  1399 -79  1402 0

c  -1+1 --> 0
c    ( b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0 ∧  p_79) -> (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧ -b^{1, 80}_0)
c  in CNF:
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_2
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_1
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_0
c  in DIMACS:
-1397  1398 -1399 -79 -1400 0
-1397  1398 -1399 -79 -1401 0
-1397  1398 -1399 -79 -1402 0

c  0+1 --> 1
c    (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧  p_79) -> (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0)
c  in CNF:
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_2
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_1
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨  b^{1, 80}_0
c  in DIMACS:
 1397  1398  1399 -79 -1400 0
 1397  1398  1399 -79 -1401 0
 1397  1398  1399 -79  1402 0

c  1+1 --> 2
c    (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0 ∧  p_79) -> (-b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0)
c  in CNF:
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_2
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨  b^{1, 80}_1
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ -p_79 ∨ -b^{1, 80}_0
c  in DIMACS:
 1397  1398 -1399 -79 -1400 0
 1397  1398 -1399 -79  1401 0
 1397  1398 -1399 -79 -1402 0

c  2+1 --> break 
c    (-b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧  p_79) -> break
c  in CNF:
c     b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ -p_79 ∨ break
c  in DIMACS:
 1397 -1398  1399 -79 1162 0


c  2-1 --> 1
c    (-b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧ -p_79) -> (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0)
c  in CNF:
c     b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_2
c     b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_1
c     b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨  b^{1, 80}_0
c  in DIMACS:
 1397 -1398  1399  79 -1400 0
 1397 -1398  1399  79 -1401 0
 1397 -1398  1399  79  1402 0

c  1-1 --> 0
c    (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0 ∧ -p_79) -> (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧ -b^{1, 80}_0)
c  in CNF:
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_2
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_1
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_0
c  in DIMACS:
 1397  1398 -1399  79 -1400 0
 1397  1398 -1399  79 -1401 0
 1397  1398 -1399  79 -1402 0

c  0-1 --> -1
c    (-b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧ -p_79) -> ( b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0)
c  in CNF:
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨  b^{1, 80}_2
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_1
c     b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨  b^{1, 80}_0
c  in DIMACS:
 1397  1398  1399  79  1400 0
 1397  1398  1399  79 -1401 0
 1397  1398  1399  79  1402 0

c  -1-1 --> -2
c    ( b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧  b^{1, 79}_0 ∧ -p_79) -> ( b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0)
c  in CNF:
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨  b^{1, 80}_2
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨  b^{1, 80}_1
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨  p_79 ∨ -b^{1, 80}_0
c  in DIMACS:
-1397  1398 -1399  79  1400 0
-1397  1398 -1399  79  1401 0
-1397  1398 -1399  79 -1402 0

c  -2-1 --> break 
c    ( b^{1, 79}_2 ∧  b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧ -p_79) -> break
c  in CNF:
c    -b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨  b^{1, 79}_0 ∨  p_79 ∨ break
c  in DIMACS:
-1397 -1398  1399  79 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 79}_2 ∧ -b^{1, 79}_1 ∧ -b^{1, 79}_0 ∧ true) 
c  in CNF:
c    -b^{1, 79}_2 ∨  b^{1, 79}_1 ∨  b^{1, 79}_0 ∨ false 
c  in DIMACS:
-1397  1398  1399  0

c  3 does not represent an automaton state.
c    -(-b^{1, 79}_2 ∧  b^{1, 79}_1 ∧  b^{1, 79}_0 ∧ true) 
c  in CNF:
c     b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ false 
c  in DIMACS:
 1397 -1398 -1399  0
c  -3 does not represent an automaton state.
c    -( b^{1, 79}_2 ∧  b^{1, 79}_1 ∧  b^{1, 79}_0 ∧ true) 
c  in CNF:
c    -b^{1, 79}_2 ∨ -b^{1, 79}_1 ∨ -b^{1, 79}_0 ∨ false 
c  in DIMACS:
-1397 -1398 -1399  0

c i = 80
c  -2+1 --> -1
c    ( b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧  p_80) -> ( b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0)
c  in CNF:
c    -b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨  b^{1, 81}_2
c    -b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_1
c    -b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨  b^{1, 81}_0
c  in DIMACS:
-1400 -1401  1402 -80  1403 0
-1400 -1401  1402 -80 -1404 0
-1400 -1401  1402 -80  1405 0

c  -1+1 --> 0
c    ( b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0 ∧  p_80) -> (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧ -b^{1, 81}_0)
c  in CNF:
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_2
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_1
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_0
c  in DIMACS:
-1400  1401 -1402 -80 -1403 0
-1400  1401 -1402 -80 -1404 0
-1400  1401 -1402 -80 -1405 0

c  0+1 --> 1
c    (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧  p_80) -> (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0)
c  in CNF:
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_2
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_1
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨  b^{1, 81}_0
c  in DIMACS:
 1400  1401  1402 -80 -1403 0
 1400  1401  1402 -80 -1404 0
 1400  1401  1402 -80  1405 0

c  1+1 --> 2
c    (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0 ∧  p_80) -> (-b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0)
c  in CNF:
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_2
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨  b^{1, 81}_1
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ -p_80 ∨ -b^{1, 81}_0
c  in DIMACS:
 1400  1401 -1402 -80 -1403 0
 1400  1401 -1402 -80  1404 0
 1400  1401 -1402 -80 -1405 0

c  2+1 --> break 
c    (-b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧  p_80) -> break
c  in CNF:
c     b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 1400 -1401  1402 -80 1162 0


c  2-1 --> 1
c    (-b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧ -p_80) -> (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0)
c  in CNF:
c     b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_2
c     b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_1
c     b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨  b^{1, 81}_0
c  in DIMACS:
 1400 -1401  1402  80 -1403 0
 1400 -1401  1402  80 -1404 0
 1400 -1401  1402  80  1405 0

c  1-1 --> 0
c    (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0 ∧ -p_80) -> (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧ -b^{1, 81}_0)
c  in CNF:
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_2
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_1
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_0
c  in DIMACS:
 1400  1401 -1402  80 -1403 0
 1400  1401 -1402  80 -1404 0
 1400  1401 -1402  80 -1405 0

c  0-1 --> -1
c    (-b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧ -p_80) -> ( b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0)
c  in CNF:
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨  b^{1, 81}_2
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_1
c     b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨  b^{1, 81}_0
c  in DIMACS:
 1400  1401  1402  80  1403 0
 1400  1401  1402  80 -1404 0
 1400  1401  1402  80  1405 0

c  -1-1 --> -2
c    ( b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧  b^{1, 80}_0 ∧ -p_80) -> ( b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0)
c  in CNF:
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨  b^{1, 81}_2
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨  b^{1, 81}_1
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨  p_80 ∨ -b^{1, 81}_0
c  in DIMACS:
-1400  1401 -1402  80  1403 0
-1400  1401 -1402  80  1404 0
-1400  1401 -1402  80 -1405 0

c  -2-1 --> break 
c    ( b^{1, 80}_2 ∧  b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨  b^{1, 80}_0 ∨  p_80 ∨ break
c  in DIMACS:
-1400 -1401  1402  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 80}_2 ∧ -b^{1, 80}_1 ∧ -b^{1, 80}_0 ∧ true) 
c  in CNF:
c    -b^{1, 80}_2 ∨  b^{1, 80}_1 ∨  b^{1, 80}_0 ∨ false 
c  in DIMACS:
-1400  1401  1402  0

c  3 does not represent an automaton state.
c    -(-b^{1, 80}_2 ∧  b^{1, 80}_1 ∧  b^{1, 80}_0 ∧ true) 
c  in CNF:
c     b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ false 
c  in DIMACS:
 1400 -1401 -1402  0
c  -3 does not represent an automaton state.
c    -( b^{1, 80}_2 ∧  b^{1, 80}_1 ∧  b^{1, 80}_0 ∧ true) 
c  in CNF:
c    -b^{1, 80}_2 ∨ -b^{1, 80}_1 ∨ -b^{1, 80}_0 ∨ false 
c  in DIMACS:
-1400 -1401 -1402  0

c i = 81
c  -2+1 --> -1
c    ( b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧  p_81) -> ( b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0)
c  in CNF:
c    -b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨  b^{1, 82}_2
c    -b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_1
c    -b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨  b^{1, 82}_0
c  in DIMACS:
-1403 -1404  1405 -81  1406 0
-1403 -1404  1405 -81 -1407 0
-1403 -1404  1405 -81  1408 0

c  -1+1 --> 0
c    ( b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0 ∧  p_81) -> (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧ -b^{1, 82}_0)
c  in CNF:
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_2
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_1
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_0
c  in DIMACS:
-1403  1404 -1405 -81 -1406 0
-1403  1404 -1405 -81 -1407 0
-1403  1404 -1405 -81 -1408 0

c  0+1 --> 1
c    (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧  p_81) -> (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0)
c  in CNF:
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_2
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_1
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨  b^{1, 82}_0
c  in DIMACS:
 1403  1404  1405 -81 -1406 0
 1403  1404  1405 -81 -1407 0
 1403  1404  1405 -81  1408 0

c  1+1 --> 2
c    (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0 ∧  p_81) -> (-b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0)
c  in CNF:
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_2
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨  b^{1, 82}_1
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ -p_81 ∨ -b^{1, 82}_0
c  in DIMACS:
 1403  1404 -1405 -81 -1406 0
 1403  1404 -1405 -81  1407 0
 1403  1404 -1405 -81 -1408 0

c  2+1 --> break 
c    (-b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧  p_81) -> break
c  in CNF:
c     b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ -p_81 ∨ break
c  in DIMACS:
 1403 -1404  1405 -81 1162 0


c  2-1 --> 1
c    (-b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧ -p_81) -> (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0)
c  in CNF:
c     b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_2
c     b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_1
c     b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨  b^{1, 82}_0
c  in DIMACS:
 1403 -1404  1405  81 -1406 0
 1403 -1404  1405  81 -1407 0
 1403 -1404  1405  81  1408 0

c  1-1 --> 0
c    (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0 ∧ -p_81) -> (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧ -b^{1, 82}_0)
c  in CNF:
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_2
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_1
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_0
c  in DIMACS:
 1403  1404 -1405  81 -1406 0
 1403  1404 -1405  81 -1407 0
 1403  1404 -1405  81 -1408 0

c  0-1 --> -1
c    (-b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧ -p_81) -> ( b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0)
c  in CNF:
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨  b^{1, 82}_2
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_1
c     b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨  b^{1, 82}_0
c  in DIMACS:
 1403  1404  1405  81  1406 0
 1403  1404  1405  81 -1407 0
 1403  1404  1405  81  1408 0

c  -1-1 --> -2
c    ( b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧  b^{1, 81}_0 ∧ -p_81) -> ( b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0)
c  in CNF:
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨  b^{1, 82}_2
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨  b^{1, 82}_1
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨  p_81 ∨ -b^{1, 82}_0
c  in DIMACS:
-1403  1404 -1405  81  1406 0
-1403  1404 -1405  81  1407 0
-1403  1404 -1405  81 -1408 0

c  -2-1 --> break 
c    ( b^{1, 81}_2 ∧  b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧ -p_81) -> break
c  in CNF:
c    -b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨  b^{1, 81}_0 ∨  p_81 ∨ break
c  in DIMACS:
-1403 -1404  1405  81 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 81}_2 ∧ -b^{1, 81}_1 ∧ -b^{1, 81}_0 ∧ true) 
c  in CNF:
c    -b^{1, 81}_2 ∨  b^{1, 81}_1 ∨  b^{1, 81}_0 ∨ false 
c  in DIMACS:
-1403  1404  1405  0

c  3 does not represent an automaton state.
c    -(-b^{1, 81}_2 ∧  b^{1, 81}_1 ∧  b^{1, 81}_0 ∧ true) 
c  in CNF:
c     b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ false 
c  in DIMACS:
 1403 -1404 -1405  0
c  -3 does not represent an automaton state.
c    -( b^{1, 81}_2 ∧  b^{1, 81}_1 ∧  b^{1, 81}_0 ∧ true) 
c  in CNF:
c    -b^{1, 81}_2 ∨ -b^{1, 81}_1 ∨ -b^{1, 81}_0 ∨ false 
c  in DIMACS:
-1403 -1404 -1405  0

c i = 82
c  -2+1 --> -1
c    ( b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧  p_82) -> ( b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0)
c  in CNF:
c    -b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨  b^{1, 83}_2
c    -b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_1
c    -b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨  b^{1, 83}_0
c  in DIMACS:
-1406 -1407  1408 -82  1409 0
-1406 -1407  1408 -82 -1410 0
-1406 -1407  1408 -82  1411 0

c  -1+1 --> 0
c    ( b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0 ∧  p_82) -> (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧ -b^{1, 83}_0)
c  in CNF:
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_2
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_1
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_0
c  in DIMACS:
-1406  1407 -1408 -82 -1409 0
-1406  1407 -1408 -82 -1410 0
-1406  1407 -1408 -82 -1411 0

c  0+1 --> 1
c    (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧  p_82) -> (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0)
c  in CNF:
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_2
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_1
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨  b^{1, 83}_0
c  in DIMACS:
 1406  1407  1408 -82 -1409 0
 1406  1407  1408 -82 -1410 0
 1406  1407  1408 -82  1411 0

c  1+1 --> 2
c    (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0 ∧  p_82) -> (-b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0)
c  in CNF:
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_2
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨  b^{1, 83}_1
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ -p_82 ∨ -b^{1, 83}_0
c  in DIMACS:
 1406  1407 -1408 -82 -1409 0
 1406  1407 -1408 -82  1410 0
 1406  1407 -1408 -82 -1411 0

c  2+1 --> break 
c    (-b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧  p_82) -> break
c  in CNF:
c     b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ -p_82 ∨ break
c  in DIMACS:
 1406 -1407  1408 -82 1162 0


c  2-1 --> 1
c    (-b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧ -p_82) -> (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0)
c  in CNF:
c     b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_2
c     b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_1
c     b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨  b^{1, 83}_0
c  in DIMACS:
 1406 -1407  1408  82 -1409 0
 1406 -1407  1408  82 -1410 0
 1406 -1407  1408  82  1411 0

c  1-1 --> 0
c    (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0 ∧ -p_82) -> (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧ -b^{1, 83}_0)
c  in CNF:
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_2
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_1
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_0
c  in DIMACS:
 1406  1407 -1408  82 -1409 0
 1406  1407 -1408  82 -1410 0
 1406  1407 -1408  82 -1411 0

c  0-1 --> -1
c    (-b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧ -p_82) -> ( b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0)
c  in CNF:
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨  b^{1, 83}_2
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_1
c     b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨  b^{1, 83}_0
c  in DIMACS:
 1406  1407  1408  82  1409 0
 1406  1407  1408  82 -1410 0
 1406  1407  1408  82  1411 0

c  -1-1 --> -2
c    ( b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧  b^{1, 82}_0 ∧ -p_82) -> ( b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0)
c  in CNF:
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨  b^{1, 83}_2
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨  b^{1, 83}_1
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨  p_82 ∨ -b^{1, 83}_0
c  in DIMACS:
-1406  1407 -1408  82  1409 0
-1406  1407 -1408  82  1410 0
-1406  1407 -1408  82 -1411 0

c  -2-1 --> break 
c    ( b^{1, 82}_2 ∧  b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧ -p_82) -> break
c  in CNF:
c    -b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨  b^{1, 82}_0 ∨  p_82 ∨ break
c  in DIMACS:
-1406 -1407  1408  82 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 82}_2 ∧ -b^{1, 82}_1 ∧ -b^{1, 82}_0 ∧ true) 
c  in CNF:
c    -b^{1, 82}_2 ∨  b^{1, 82}_1 ∨  b^{1, 82}_0 ∨ false 
c  in DIMACS:
-1406  1407  1408  0

c  3 does not represent an automaton state.
c    -(-b^{1, 82}_2 ∧  b^{1, 82}_1 ∧  b^{1, 82}_0 ∧ true) 
c  in CNF:
c     b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ false 
c  in DIMACS:
 1406 -1407 -1408  0
c  -3 does not represent an automaton state.
c    -( b^{1, 82}_2 ∧  b^{1, 82}_1 ∧  b^{1, 82}_0 ∧ true) 
c  in CNF:
c    -b^{1, 82}_2 ∨ -b^{1, 82}_1 ∨ -b^{1, 82}_0 ∨ false 
c  in DIMACS:
-1406 -1407 -1408  0

c i = 83
c  -2+1 --> -1
c    ( b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧  p_83) -> ( b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0)
c  in CNF:
c    -b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨  b^{1, 84}_2
c    -b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_1
c    -b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨  b^{1, 84}_0
c  in DIMACS:
-1409 -1410  1411 -83  1412 0
-1409 -1410  1411 -83 -1413 0
-1409 -1410  1411 -83  1414 0

c  -1+1 --> 0
c    ( b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0 ∧  p_83) -> (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧ -b^{1, 84}_0)
c  in CNF:
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_2
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_1
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_0
c  in DIMACS:
-1409  1410 -1411 -83 -1412 0
-1409  1410 -1411 -83 -1413 0
-1409  1410 -1411 -83 -1414 0

c  0+1 --> 1
c    (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧  p_83) -> (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0)
c  in CNF:
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_2
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_1
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨  b^{1, 84}_0
c  in DIMACS:
 1409  1410  1411 -83 -1412 0
 1409  1410  1411 -83 -1413 0
 1409  1410  1411 -83  1414 0

c  1+1 --> 2
c    (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0 ∧  p_83) -> (-b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0)
c  in CNF:
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_2
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨  b^{1, 84}_1
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ -p_83 ∨ -b^{1, 84}_0
c  in DIMACS:
 1409  1410 -1411 -83 -1412 0
 1409  1410 -1411 -83  1413 0
 1409  1410 -1411 -83 -1414 0

c  2+1 --> break 
c    (-b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧  p_83) -> break
c  in CNF:
c     b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ -p_83 ∨ break
c  in DIMACS:
 1409 -1410  1411 -83 1162 0


c  2-1 --> 1
c    (-b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧ -p_83) -> (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0)
c  in CNF:
c     b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_2
c     b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_1
c     b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨  b^{1, 84}_0
c  in DIMACS:
 1409 -1410  1411  83 -1412 0
 1409 -1410  1411  83 -1413 0
 1409 -1410  1411  83  1414 0

c  1-1 --> 0
c    (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0 ∧ -p_83) -> (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧ -b^{1, 84}_0)
c  in CNF:
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_2
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_1
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_0
c  in DIMACS:
 1409  1410 -1411  83 -1412 0
 1409  1410 -1411  83 -1413 0
 1409  1410 -1411  83 -1414 0

c  0-1 --> -1
c    (-b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧ -p_83) -> ( b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0)
c  in CNF:
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨  b^{1, 84}_2
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_1
c     b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨  b^{1, 84}_0
c  in DIMACS:
 1409  1410  1411  83  1412 0
 1409  1410  1411  83 -1413 0
 1409  1410  1411  83  1414 0

c  -1-1 --> -2
c    ( b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧  b^{1, 83}_0 ∧ -p_83) -> ( b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0)
c  in CNF:
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨  b^{1, 84}_2
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨  b^{1, 84}_1
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨  p_83 ∨ -b^{1, 84}_0
c  in DIMACS:
-1409  1410 -1411  83  1412 0
-1409  1410 -1411  83  1413 0
-1409  1410 -1411  83 -1414 0

c  -2-1 --> break 
c    ( b^{1, 83}_2 ∧  b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧ -p_83) -> break
c  in CNF:
c    -b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨  b^{1, 83}_0 ∨  p_83 ∨ break
c  in DIMACS:
-1409 -1410  1411  83 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 83}_2 ∧ -b^{1, 83}_1 ∧ -b^{1, 83}_0 ∧ true) 
c  in CNF:
c    -b^{1, 83}_2 ∨  b^{1, 83}_1 ∨  b^{1, 83}_0 ∨ false 
c  in DIMACS:
-1409  1410  1411  0

c  3 does not represent an automaton state.
c    -(-b^{1, 83}_2 ∧  b^{1, 83}_1 ∧  b^{1, 83}_0 ∧ true) 
c  in CNF:
c     b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ false 
c  in DIMACS:
 1409 -1410 -1411  0
c  -3 does not represent an automaton state.
c    -( b^{1, 83}_2 ∧  b^{1, 83}_1 ∧  b^{1, 83}_0 ∧ true) 
c  in CNF:
c    -b^{1, 83}_2 ∨ -b^{1, 83}_1 ∨ -b^{1, 83}_0 ∨ false 
c  in DIMACS:
-1409 -1410 -1411  0

c i = 84
c  -2+1 --> -1
c    ( b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧  p_84) -> ( b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0)
c  in CNF:
c    -b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨  b^{1, 85}_2
c    -b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_1
c    -b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨  b^{1, 85}_0
c  in DIMACS:
-1412 -1413  1414 -84  1415 0
-1412 -1413  1414 -84 -1416 0
-1412 -1413  1414 -84  1417 0

c  -1+1 --> 0
c    ( b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0 ∧  p_84) -> (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧ -b^{1, 85}_0)
c  in CNF:
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_2
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_1
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_0
c  in DIMACS:
-1412  1413 -1414 -84 -1415 0
-1412  1413 -1414 -84 -1416 0
-1412  1413 -1414 -84 -1417 0

c  0+1 --> 1
c    (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧  p_84) -> (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0)
c  in CNF:
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_2
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_1
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨  b^{1, 85}_0
c  in DIMACS:
 1412  1413  1414 -84 -1415 0
 1412  1413  1414 -84 -1416 0
 1412  1413  1414 -84  1417 0

c  1+1 --> 2
c    (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0 ∧  p_84) -> (-b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0)
c  in CNF:
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_2
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨  b^{1, 85}_1
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ -p_84 ∨ -b^{1, 85}_0
c  in DIMACS:
 1412  1413 -1414 -84 -1415 0
 1412  1413 -1414 -84  1416 0
 1412  1413 -1414 -84 -1417 0

c  2+1 --> break 
c    (-b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧  p_84) -> break
c  in CNF:
c     b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 1412 -1413  1414 -84 1162 0


c  2-1 --> 1
c    (-b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧ -p_84) -> (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0)
c  in CNF:
c     b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_2
c     b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_1
c     b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨  b^{1, 85}_0
c  in DIMACS:
 1412 -1413  1414  84 -1415 0
 1412 -1413  1414  84 -1416 0
 1412 -1413  1414  84  1417 0

c  1-1 --> 0
c    (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0 ∧ -p_84) -> (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧ -b^{1, 85}_0)
c  in CNF:
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_2
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_1
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_0
c  in DIMACS:
 1412  1413 -1414  84 -1415 0
 1412  1413 -1414  84 -1416 0
 1412  1413 -1414  84 -1417 0

c  0-1 --> -1
c    (-b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧ -p_84) -> ( b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0)
c  in CNF:
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨  b^{1, 85}_2
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_1
c     b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨  b^{1, 85}_0
c  in DIMACS:
 1412  1413  1414  84  1415 0
 1412  1413  1414  84 -1416 0
 1412  1413  1414  84  1417 0

c  -1-1 --> -2
c    ( b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧  b^{1, 84}_0 ∧ -p_84) -> ( b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0)
c  in CNF:
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨  b^{1, 85}_2
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨  b^{1, 85}_1
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨  p_84 ∨ -b^{1, 85}_0
c  in DIMACS:
-1412  1413 -1414  84  1415 0
-1412  1413 -1414  84  1416 0
-1412  1413 -1414  84 -1417 0

c  -2-1 --> break 
c    ( b^{1, 84}_2 ∧  b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨  b^{1, 84}_0 ∨  p_84 ∨ break
c  in DIMACS:
-1412 -1413  1414  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 84}_2 ∧ -b^{1, 84}_1 ∧ -b^{1, 84}_0 ∧ true) 
c  in CNF:
c    -b^{1, 84}_2 ∨  b^{1, 84}_1 ∨  b^{1, 84}_0 ∨ false 
c  in DIMACS:
-1412  1413  1414  0

c  3 does not represent an automaton state.
c    -(-b^{1, 84}_2 ∧  b^{1, 84}_1 ∧  b^{1, 84}_0 ∧ true) 
c  in CNF:
c     b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ false 
c  in DIMACS:
 1412 -1413 -1414  0
c  -3 does not represent an automaton state.
c    -( b^{1, 84}_2 ∧  b^{1, 84}_1 ∧  b^{1, 84}_0 ∧ true) 
c  in CNF:
c    -b^{1, 84}_2 ∨ -b^{1, 84}_1 ∨ -b^{1, 84}_0 ∨ false 
c  in DIMACS:
-1412 -1413 -1414  0

c i = 85
c  -2+1 --> -1
c    ( b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧  p_85) -> ( b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0)
c  in CNF:
c    -b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨  b^{1, 86}_2
c    -b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_1
c    -b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨  b^{1, 86}_0
c  in DIMACS:
-1415 -1416  1417 -85  1418 0
-1415 -1416  1417 -85 -1419 0
-1415 -1416  1417 -85  1420 0

c  -1+1 --> 0
c    ( b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0 ∧  p_85) -> (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧ -b^{1, 86}_0)
c  in CNF:
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_2
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_1
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_0
c  in DIMACS:
-1415  1416 -1417 -85 -1418 0
-1415  1416 -1417 -85 -1419 0
-1415  1416 -1417 -85 -1420 0

c  0+1 --> 1
c    (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧  p_85) -> (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0)
c  in CNF:
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_2
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_1
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨  b^{1, 86}_0
c  in DIMACS:
 1415  1416  1417 -85 -1418 0
 1415  1416  1417 -85 -1419 0
 1415  1416  1417 -85  1420 0

c  1+1 --> 2
c    (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0 ∧  p_85) -> (-b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0)
c  in CNF:
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_2
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨  b^{1, 86}_1
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ -p_85 ∨ -b^{1, 86}_0
c  in DIMACS:
 1415  1416 -1417 -85 -1418 0
 1415  1416 -1417 -85  1419 0
 1415  1416 -1417 -85 -1420 0

c  2+1 --> break 
c    (-b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧  p_85) -> break
c  in CNF:
c     b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ -p_85 ∨ break
c  in DIMACS:
 1415 -1416  1417 -85 1162 0


c  2-1 --> 1
c    (-b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧ -p_85) -> (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0)
c  in CNF:
c     b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_2
c     b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_1
c     b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨  b^{1, 86}_0
c  in DIMACS:
 1415 -1416  1417  85 -1418 0
 1415 -1416  1417  85 -1419 0
 1415 -1416  1417  85  1420 0

c  1-1 --> 0
c    (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0 ∧ -p_85) -> (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧ -b^{1, 86}_0)
c  in CNF:
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_2
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_1
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_0
c  in DIMACS:
 1415  1416 -1417  85 -1418 0
 1415  1416 -1417  85 -1419 0
 1415  1416 -1417  85 -1420 0

c  0-1 --> -1
c    (-b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧ -p_85) -> ( b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0)
c  in CNF:
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨  b^{1, 86}_2
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_1
c     b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨  b^{1, 86}_0
c  in DIMACS:
 1415  1416  1417  85  1418 0
 1415  1416  1417  85 -1419 0
 1415  1416  1417  85  1420 0

c  -1-1 --> -2
c    ( b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧  b^{1, 85}_0 ∧ -p_85) -> ( b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0)
c  in CNF:
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨  b^{1, 86}_2
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨  b^{1, 86}_1
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨  p_85 ∨ -b^{1, 86}_0
c  in DIMACS:
-1415  1416 -1417  85  1418 0
-1415  1416 -1417  85  1419 0
-1415  1416 -1417  85 -1420 0

c  -2-1 --> break 
c    ( b^{1, 85}_2 ∧  b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧ -p_85) -> break
c  in CNF:
c    -b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨  b^{1, 85}_0 ∨  p_85 ∨ break
c  in DIMACS:
-1415 -1416  1417  85 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 85}_2 ∧ -b^{1, 85}_1 ∧ -b^{1, 85}_0 ∧ true) 
c  in CNF:
c    -b^{1, 85}_2 ∨  b^{1, 85}_1 ∨  b^{1, 85}_0 ∨ false 
c  in DIMACS:
-1415  1416  1417  0

c  3 does not represent an automaton state.
c    -(-b^{1, 85}_2 ∧  b^{1, 85}_1 ∧  b^{1, 85}_0 ∧ true) 
c  in CNF:
c     b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ false 
c  in DIMACS:
 1415 -1416 -1417  0
c  -3 does not represent an automaton state.
c    -( b^{1, 85}_2 ∧  b^{1, 85}_1 ∧  b^{1, 85}_0 ∧ true) 
c  in CNF:
c    -b^{1, 85}_2 ∨ -b^{1, 85}_1 ∨ -b^{1, 85}_0 ∨ false 
c  in DIMACS:
-1415 -1416 -1417  0

c i = 86
c  -2+1 --> -1
c    ( b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧  p_86) -> ( b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0)
c  in CNF:
c    -b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨  b^{1, 87}_2
c    -b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_1
c    -b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨  b^{1, 87}_0
c  in DIMACS:
-1418 -1419  1420 -86  1421 0
-1418 -1419  1420 -86 -1422 0
-1418 -1419  1420 -86  1423 0

c  -1+1 --> 0
c    ( b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0 ∧  p_86) -> (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧ -b^{1, 87}_0)
c  in CNF:
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_2
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_1
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_0
c  in DIMACS:
-1418  1419 -1420 -86 -1421 0
-1418  1419 -1420 -86 -1422 0
-1418  1419 -1420 -86 -1423 0

c  0+1 --> 1
c    (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧  p_86) -> (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0)
c  in CNF:
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_2
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_1
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨  b^{1, 87}_0
c  in DIMACS:
 1418  1419  1420 -86 -1421 0
 1418  1419  1420 -86 -1422 0
 1418  1419  1420 -86  1423 0

c  1+1 --> 2
c    (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0 ∧  p_86) -> (-b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0)
c  in CNF:
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_2
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨  b^{1, 87}_1
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ -p_86 ∨ -b^{1, 87}_0
c  in DIMACS:
 1418  1419 -1420 -86 -1421 0
 1418  1419 -1420 -86  1422 0
 1418  1419 -1420 -86 -1423 0

c  2+1 --> break 
c    (-b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧  p_86) -> break
c  in CNF:
c     b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ -p_86 ∨ break
c  in DIMACS:
 1418 -1419  1420 -86 1162 0


c  2-1 --> 1
c    (-b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧ -p_86) -> (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0)
c  in CNF:
c     b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_2
c     b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_1
c     b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨  b^{1, 87}_0
c  in DIMACS:
 1418 -1419  1420  86 -1421 0
 1418 -1419  1420  86 -1422 0
 1418 -1419  1420  86  1423 0

c  1-1 --> 0
c    (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0 ∧ -p_86) -> (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧ -b^{1, 87}_0)
c  in CNF:
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_2
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_1
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_0
c  in DIMACS:
 1418  1419 -1420  86 -1421 0
 1418  1419 -1420  86 -1422 0
 1418  1419 -1420  86 -1423 0

c  0-1 --> -1
c    (-b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧ -p_86) -> ( b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0)
c  in CNF:
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨  b^{1, 87}_2
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_1
c     b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨  b^{1, 87}_0
c  in DIMACS:
 1418  1419  1420  86  1421 0
 1418  1419  1420  86 -1422 0
 1418  1419  1420  86  1423 0

c  -1-1 --> -2
c    ( b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧  b^{1, 86}_0 ∧ -p_86) -> ( b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0)
c  in CNF:
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨  b^{1, 87}_2
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨  b^{1, 87}_1
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨  p_86 ∨ -b^{1, 87}_0
c  in DIMACS:
-1418  1419 -1420  86  1421 0
-1418  1419 -1420  86  1422 0
-1418  1419 -1420  86 -1423 0

c  -2-1 --> break 
c    ( b^{1, 86}_2 ∧  b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧ -p_86) -> break
c  in CNF:
c    -b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨  b^{1, 86}_0 ∨  p_86 ∨ break
c  in DIMACS:
-1418 -1419  1420  86 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 86}_2 ∧ -b^{1, 86}_1 ∧ -b^{1, 86}_0 ∧ true) 
c  in CNF:
c    -b^{1, 86}_2 ∨  b^{1, 86}_1 ∨  b^{1, 86}_0 ∨ false 
c  in DIMACS:
-1418  1419  1420  0

c  3 does not represent an automaton state.
c    -(-b^{1, 86}_2 ∧  b^{1, 86}_1 ∧  b^{1, 86}_0 ∧ true) 
c  in CNF:
c     b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ false 
c  in DIMACS:
 1418 -1419 -1420  0
c  -3 does not represent an automaton state.
c    -( b^{1, 86}_2 ∧  b^{1, 86}_1 ∧  b^{1, 86}_0 ∧ true) 
c  in CNF:
c    -b^{1, 86}_2 ∨ -b^{1, 86}_1 ∨ -b^{1, 86}_0 ∨ false 
c  in DIMACS:
-1418 -1419 -1420  0

c i = 87
c  -2+1 --> -1
c    ( b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧  p_87) -> ( b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0)
c  in CNF:
c    -b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨  b^{1, 88}_2
c    -b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_1
c    -b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨  b^{1, 88}_0
c  in DIMACS:
-1421 -1422  1423 -87  1424 0
-1421 -1422  1423 -87 -1425 0
-1421 -1422  1423 -87  1426 0

c  -1+1 --> 0
c    ( b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0 ∧  p_87) -> (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧ -b^{1, 88}_0)
c  in CNF:
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_2
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_1
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_0
c  in DIMACS:
-1421  1422 -1423 -87 -1424 0
-1421  1422 -1423 -87 -1425 0
-1421  1422 -1423 -87 -1426 0

c  0+1 --> 1
c    (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧  p_87) -> (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0)
c  in CNF:
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_2
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_1
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨  b^{1, 88}_0
c  in DIMACS:
 1421  1422  1423 -87 -1424 0
 1421  1422  1423 -87 -1425 0
 1421  1422  1423 -87  1426 0

c  1+1 --> 2
c    (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0 ∧  p_87) -> (-b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0)
c  in CNF:
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_2
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨  b^{1, 88}_1
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ -p_87 ∨ -b^{1, 88}_0
c  in DIMACS:
 1421  1422 -1423 -87 -1424 0
 1421  1422 -1423 -87  1425 0
 1421  1422 -1423 -87 -1426 0

c  2+1 --> break 
c    (-b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧  p_87) -> break
c  in CNF:
c     b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ -p_87 ∨ break
c  in DIMACS:
 1421 -1422  1423 -87 1162 0


c  2-1 --> 1
c    (-b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧ -p_87) -> (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0)
c  in CNF:
c     b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_2
c     b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_1
c     b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨  b^{1, 88}_0
c  in DIMACS:
 1421 -1422  1423  87 -1424 0
 1421 -1422  1423  87 -1425 0
 1421 -1422  1423  87  1426 0

c  1-1 --> 0
c    (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0 ∧ -p_87) -> (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧ -b^{1, 88}_0)
c  in CNF:
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_2
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_1
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_0
c  in DIMACS:
 1421  1422 -1423  87 -1424 0
 1421  1422 -1423  87 -1425 0
 1421  1422 -1423  87 -1426 0

c  0-1 --> -1
c    (-b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧ -p_87) -> ( b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0)
c  in CNF:
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨  b^{1, 88}_2
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_1
c     b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨  b^{1, 88}_0
c  in DIMACS:
 1421  1422  1423  87  1424 0
 1421  1422  1423  87 -1425 0
 1421  1422  1423  87  1426 0

c  -1-1 --> -2
c    ( b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧  b^{1, 87}_0 ∧ -p_87) -> ( b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0)
c  in CNF:
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨  b^{1, 88}_2
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨  b^{1, 88}_1
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨  p_87 ∨ -b^{1, 88}_0
c  in DIMACS:
-1421  1422 -1423  87  1424 0
-1421  1422 -1423  87  1425 0
-1421  1422 -1423  87 -1426 0

c  -2-1 --> break 
c    ( b^{1, 87}_2 ∧  b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧ -p_87) -> break
c  in CNF:
c    -b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨  b^{1, 87}_0 ∨  p_87 ∨ break
c  in DIMACS:
-1421 -1422  1423  87 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 87}_2 ∧ -b^{1, 87}_1 ∧ -b^{1, 87}_0 ∧ true) 
c  in CNF:
c    -b^{1, 87}_2 ∨  b^{1, 87}_1 ∨  b^{1, 87}_0 ∨ false 
c  in DIMACS:
-1421  1422  1423  0

c  3 does not represent an automaton state.
c    -(-b^{1, 87}_2 ∧  b^{1, 87}_1 ∧  b^{1, 87}_0 ∧ true) 
c  in CNF:
c     b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ false 
c  in DIMACS:
 1421 -1422 -1423  0
c  -3 does not represent an automaton state.
c    -( b^{1, 87}_2 ∧  b^{1, 87}_1 ∧  b^{1, 87}_0 ∧ true) 
c  in CNF:
c    -b^{1, 87}_2 ∨ -b^{1, 87}_1 ∨ -b^{1, 87}_0 ∨ false 
c  in DIMACS:
-1421 -1422 -1423  0

c i = 88
c  -2+1 --> -1
c    ( b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧  p_88) -> ( b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0)
c  in CNF:
c    -b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨  b^{1, 89}_2
c    -b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_1
c    -b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨  b^{1, 89}_0
c  in DIMACS:
-1424 -1425  1426 -88  1427 0
-1424 -1425  1426 -88 -1428 0
-1424 -1425  1426 -88  1429 0

c  -1+1 --> 0
c    ( b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0 ∧  p_88) -> (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧ -b^{1, 89}_0)
c  in CNF:
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_2
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_1
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_0
c  in DIMACS:
-1424  1425 -1426 -88 -1427 0
-1424  1425 -1426 -88 -1428 0
-1424  1425 -1426 -88 -1429 0

c  0+1 --> 1
c    (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧  p_88) -> (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0)
c  in CNF:
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_2
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_1
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨  b^{1, 89}_0
c  in DIMACS:
 1424  1425  1426 -88 -1427 0
 1424  1425  1426 -88 -1428 0
 1424  1425  1426 -88  1429 0

c  1+1 --> 2
c    (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0 ∧  p_88) -> (-b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0)
c  in CNF:
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_2
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨  b^{1, 89}_1
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ -p_88 ∨ -b^{1, 89}_0
c  in DIMACS:
 1424  1425 -1426 -88 -1427 0
 1424  1425 -1426 -88  1428 0
 1424  1425 -1426 -88 -1429 0

c  2+1 --> break 
c    (-b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧  p_88) -> break
c  in CNF:
c     b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 1424 -1425  1426 -88 1162 0


c  2-1 --> 1
c    (-b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧ -p_88) -> (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0)
c  in CNF:
c     b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_2
c     b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_1
c     b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨  b^{1, 89}_0
c  in DIMACS:
 1424 -1425  1426  88 -1427 0
 1424 -1425  1426  88 -1428 0
 1424 -1425  1426  88  1429 0

c  1-1 --> 0
c    (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0 ∧ -p_88) -> (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧ -b^{1, 89}_0)
c  in CNF:
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_2
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_1
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_0
c  in DIMACS:
 1424  1425 -1426  88 -1427 0
 1424  1425 -1426  88 -1428 0
 1424  1425 -1426  88 -1429 0

c  0-1 --> -1
c    (-b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧ -p_88) -> ( b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0)
c  in CNF:
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨  b^{1, 89}_2
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_1
c     b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨  b^{1, 89}_0
c  in DIMACS:
 1424  1425  1426  88  1427 0
 1424  1425  1426  88 -1428 0
 1424  1425  1426  88  1429 0

c  -1-1 --> -2
c    ( b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧  b^{1, 88}_0 ∧ -p_88) -> ( b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0)
c  in CNF:
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨  b^{1, 89}_2
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨  b^{1, 89}_1
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨  p_88 ∨ -b^{1, 89}_0
c  in DIMACS:
-1424  1425 -1426  88  1427 0
-1424  1425 -1426  88  1428 0
-1424  1425 -1426  88 -1429 0

c  -2-1 --> break 
c    ( b^{1, 88}_2 ∧  b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨  b^{1, 88}_0 ∨  p_88 ∨ break
c  in DIMACS:
-1424 -1425  1426  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 88}_2 ∧ -b^{1, 88}_1 ∧ -b^{1, 88}_0 ∧ true) 
c  in CNF:
c    -b^{1, 88}_2 ∨  b^{1, 88}_1 ∨  b^{1, 88}_0 ∨ false 
c  in DIMACS:
-1424  1425  1426  0

c  3 does not represent an automaton state.
c    -(-b^{1, 88}_2 ∧  b^{1, 88}_1 ∧  b^{1, 88}_0 ∧ true) 
c  in CNF:
c     b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ false 
c  in DIMACS:
 1424 -1425 -1426  0
c  -3 does not represent an automaton state.
c    -( b^{1, 88}_2 ∧  b^{1, 88}_1 ∧  b^{1, 88}_0 ∧ true) 
c  in CNF:
c    -b^{1, 88}_2 ∨ -b^{1, 88}_1 ∨ -b^{1, 88}_0 ∨ false 
c  in DIMACS:
-1424 -1425 -1426  0

c i = 89
c  -2+1 --> -1
c    ( b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧  p_89) -> ( b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0)
c  in CNF:
c    -b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨  b^{1, 90}_2
c    -b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_1
c    -b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨  b^{1, 90}_0
c  in DIMACS:
-1427 -1428  1429 -89  1430 0
-1427 -1428  1429 -89 -1431 0
-1427 -1428  1429 -89  1432 0

c  -1+1 --> 0
c    ( b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0 ∧  p_89) -> (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧ -b^{1, 90}_0)
c  in CNF:
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_2
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_1
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_0
c  in DIMACS:
-1427  1428 -1429 -89 -1430 0
-1427  1428 -1429 -89 -1431 0
-1427  1428 -1429 -89 -1432 0

c  0+1 --> 1
c    (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧  p_89) -> (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0)
c  in CNF:
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_2
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_1
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨  b^{1, 90}_0
c  in DIMACS:
 1427  1428  1429 -89 -1430 0
 1427  1428  1429 -89 -1431 0
 1427  1428  1429 -89  1432 0

c  1+1 --> 2
c    (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0 ∧  p_89) -> (-b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0)
c  in CNF:
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_2
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨  b^{1, 90}_1
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ -p_89 ∨ -b^{1, 90}_0
c  in DIMACS:
 1427  1428 -1429 -89 -1430 0
 1427  1428 -1429 -89  1431 0
 1427  1428 -1429 -89 -1432 0

c  2+1 --> break 
c    (-b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧  p_89) -> break
c  in CNF:
c     b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ -p_89 ∨ break
c  in DIMACS:
 1427 -1428  1429 -89 1162 0


c  2-1 --> 1
c    (-b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧ -p_89) -> (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0)
c  in CNF:
c     b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_2
c     b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_1
c     b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨  b^{1, 90}_0
c  in DIMACS:
 1427 -1428  1429  89 -1430 0
 1427 -1428  1429  89 -1431 0
 1427 -1428  1429  89  1432 0

c  1-1 --> 0
c    (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0 ∧ -p_89) -> (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧ -b^{1, 90}_0)
c  in CNF:
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_2
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_1
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_0
c  in DIMACS:
 1427  1428 -1429  89 -1430 0
 1427  1428 -1429  89 -1431 0
 1427  1428 -1429  89 -1432 0

c  0-1 --> -1
c    (-b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧ -p_89) -> ( b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0)
c  in CNF:
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨  b^{1, 90}_2
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_1
c     b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨  b^{1, 90}_0
c  in DIMACS:
 1427  1428  1429  89  1430 0
 1427  1428  1429  89 -1431 0
 1427  1428  1429  89  1432 0

c  -1-1 --> -2
c    ( b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧  b^{1, 89}_0 ∧ -p_89) -> ( b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0)
c  in CNF:
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨  b^{1, 90}_2
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨  b^{1, 90}_1
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨  p_89 ∨ -b^{1, 90}_0
c  in DIMACS:
-1427  1428 -1429  89  1430 0
-1427  1428 -1429  89  1431 0
-1427  1428 -1429  89 -1432 0

c  -2-1 --> break 
c    ( b^{1, 89}_2 ∧  b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧ -p_89) -> break
c  in CNF:
c    -b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨  b^{1, 89}_0 ∨  p_89 ∨ break
c  in DIMACS:
-1427 -1428  1429  89 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 89}_2 ∧ -b^{1, 89}_1 ∧ -b^{1, 89}_0 ∧ true) 
c  in CNF:
c    -b^{1, 89}_2 ∨  b^{1, 89}_1 ∨  b^{1, 89}_0 ∨ false 
c  in DIMACS:
-1427  1428  1429  0

c  3 does not represent an automaton state.
c    -(-b^{1, 89}_2 ∧  b^{1, 89}_1 ∧  b^{1, 89}_0 ∧ true) 
c  in CNF:
c     b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ false 
c  in DIMACS:
 1427 -1428 -1429  0
c  -3 does not represent an automaton state.
c    -( b^{1, 89}_2 ∧  b^{1, 89}_1 ∧  b^{1, 89}_0 ∧ true) 
c  in CNF:
c    -b^{1, 89}_2 ∨ -b^{1, 89}_1 ∨ -b^{1, 89}_0 ∨ false 
c  in DIMACS:
-1427 -1428 -1429  0

c i = 90
c  -2+1 --> -1
c    ( b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧  p_90) -> ( b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0)
c  in CNF:
c    -b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨  b^{1, 91}_2
c    -b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_1
c    -b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨  b^{1, 91}_0
c  in DIMACS:
-1430 -1431  1432 -90  1433 0
-1430 -1431  1432 -90 -1434 0
-1430 -1431  1432 -90  1435 0

c  -1+1 --> 0
c    ( b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0 ∧  p_90) -> (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧ -b^{1, 91}_0)
c  in CNF:
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_2
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_1
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_0
c  in DIMACS:
-1430  1431 -1432 -90 -1433 0
-1430  1431 -1432 -90 -1434 0
-1430  1431 -1432 -90 -1435 0

c  0+1 --> 1
c    (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧  p_90) -> (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0)
c  in CNF:
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_2
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_1
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨  b^{1, 91}_0
c  in DIMACS:
 1430  1431  1432 -90 -1433 0
 1430  1431  1432 -90 -1434 0
 1430  1431  1432 -90  1435 0

c  1+1 --> 2
c    (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0 ∧  p_90) -> (-b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0)
c  in CNF:
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_2
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨  b^{1, 91}_1
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ -p_90 ∨ -b^{1, 91}_0
c  in DIMACS:
 1430  1431 -1432 -90 -1433 0
 1430  1431 -1432 -90  1434 0
 1430  1431 -1432 -90 -1435 0

c  2+1 --> break 
c    (-b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧  p_90) -> break
c  in CNF:
c     b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 1430 -1431  1432 -90 1162 0


c  2-1 --> 1
c    (-b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧ -p_90) -> (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0)
c  in CNF:
c     b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_2
c     b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_1
c     b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨  b^{1, 91}_0
c  in DIMACS:
 1430 -1431  1432  90 -1433 0
 1430 -1431  1432  90 -1434 0
 1430 -1431  1432  90  1435 0

c  1-1 --> 0
c    (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0 ∧ -p_90) -> (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧ -b^{1, 91}_0)
c  in CNF:
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_2
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_1
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_0
c  in DIMACS:
 1430  1431 -1432  90 -1433 0
 1430  1431 -1432  90 -1434 0
 1430  1431 -1432  90 -1435 0

c  0-1 --> -1
c    (-b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧ -p_90) -> ( b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0)
c  in CNF:
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨  b^{1, 91}_2
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_1
c     b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨  b^{1, 91}_0
c  in DIMACS:
 1430  1431  1432  90  1433 0
 1430  1431  1432  90 -1434 0
 1430  1431  1432  90  1435 0

c  -1-1 --> -2
c    ( b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧  b^{1, 90}_0 ∧ -p_90) -> ( b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0)
c  in CNF:
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨  b^{1, 91}_2
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨  b^{1, 91}_1
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨  p_90 ∨ -b^{1, 91}_0
c  in DIMACS:
-1430  1431 -1432  90  1433 0
-1430  1431 -1432  90  1434 0
-1430  1431 -1432  90 -1435 0

c  -2-1 --> break 
c    ( b^{1, 90}_2 ∧  b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨  b^{1, 90}_0 ∨  p_90 ∨ break
c  in DIMACS:
-1430 -1431  1432  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 90}_2 ∧ -b^{1, 90}_1 ∧ -b^{1, 90}_0 ∧ true) 
c  in CNF:
c    -b^{1, 90}_2 ∨  b^{1, 90}_1 ∨  b^{1, 90}_0 ∨ false 
c  in DIMACS:
-1430  1431  1432  0

c  3 does not represent an automaton state.
c    -(-b^{1, 90}_2 ∧  b^{1, 90}_1 ∧  b^{1, 90}_0 ∧ true) 
c  in CNF:
c     b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ false 
c  in DIMACS:
 1430 -1431 -1432  0
c  -3 does not represent an automaton state.
c    -( b^{1, 90}_2 ∧  b^{1, 90}_1 ∧  b^{1, 90}_0 ∧ true) 
c  in CNF:
c    -b^{1, 90}_2 ∨ -b^{1, 90}_1 ∨ -b^{1, 90}_0 ∨ false 
c  in DIMACS:
-1430 -1431 -1432  0

c i = 91
c  -2+1 --> -1
c    ( b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧  p_91) -> ( b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0)
c  in CNF:
c    -b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨  b^{1, 92}_2
c    -b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_1
c    -b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨  b^{1, 92}_0
c  in DIMACS:
-1433 -1434  1435 -91  1436 0
-1433 -1434  1435 -91 -1437 0
-1433 -1434  1435 -91  1438 0

c  -1+1 --> 0
c    ( b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0 ∧  p_91) -> (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧ -b^{1, 92}_0)
c  in CNF:
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_2
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_1
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_0
c  in DIMACS:
-1433  1434 -1435 -91 -1436 0
-1433  1434 -1435 -91 -1437 0
-1433  1434 -1435 -91 -1438 0

c  0+1 --> 1
c    (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧  p_91) -> (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0)
c  in CNF:
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_2
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_1
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨  b^{1, 92}_0
c  in DIMACS:
 1433  1434  1435 -91 -1436 0
 1433  1434  1435 -91 -1437 0
 1433  1434  1435 -91  1438 0

c  1+1 --> 2
c    (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0 ∧  p_91) -> (-b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0)
c  in CNF:
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_2
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨  b^{1, 92}_1
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ -p_91 ∨ -b^{1, 92}_0
c  in DIMACS:
 1433  1434 -1435 -91 -1436 0
 1433  1434 -1435 -91  1437 0
 1433  1434 -1435 -91 -1438 0

c  2+1 --> break 
c    (-b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧  p_91) -> break
c  in CNF:
c     b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ -p_91 ∨ break
c  in DIMACS:
 1433 -1434  1435 -91 1162 0


c  2-1 --> 1
c    (-b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧ -p_91) -> (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0)
c  in CNF:
c     b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_2
c     b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_1
c     b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨  b^{1, 92}_0
c  in DIMACS:
 1433 -1434  1435  91 -1436 0
 1433 -1434  1435  91 -1437 0
 1433 -1434  1435  91  1438 0

c  1-1 --> 0
c    (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0 ∧ -p_91) -> (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧ -b^{1, 92}_0)
c  in CNF:
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_2
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_1
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_0
c  in DIMACS:
 1433  1434 -1435  91 -1436 0
 1433  1434 -1435  91 -1437 0
 1433  1434 -1435  91 -1438 0

c  0-1 --> -1
c    (-b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧ -p_91) -> ( b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0)
c  in CNF:
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨  b^{1, 92}_2
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_1
c     b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨  b^{1, 92}_0
c  in DIMACS:
 1433  1434  1435  91  1436 0
 1433  1434  1435  91 -1437 0
 1433  1434  1435  91  1438 0

c  -1-1 --> -2
c    ( b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧  b^{1, 91}_0 ∧ -p_91) -> ( b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0)
c  in CNF:
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨  b^{1, 92}_2
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨  b^{1, 92}_1
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨  p_91 ∨ -b^{1, 92}_0
c  in DIMACS:
-1433  1434 -1435  91  1436 0
-1433  1434 -1435  91  1437 0
-1433  1434 -1435  91 -1438 0

c  -2-1 --> break 
c    ( b^{1, 91}_2 ∧  b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧ -p_91) -> break
c  in CNF:
c    -b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨  b^{1, 91}_0 ∨  p_91 ∨ break
c  in DIMACS:
-1433 -1434  1435  91 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 91}_2 ∧ -b^{1, 91}_1 ∧ -b^{1, 91}_0 ∧ true) 
c  in CNF:
c    -b^{1, 91}_2 ∨  b^{1, 91}_1 ∨  b^{1, 91}_0 ∨ false 
c  in DIMACS:
-1433  1434  1435  0

c  3 does not represent an automaton state.
c    -(-b^{1, 91}_2 ∧  b^{1, 91}_1 ∧  b^{1, 91}_0 ∧ true) 
c  in CNF:
c     b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ false 
c  in DIMACS:
 1433 -1434 -1435  0
c  -3 does not represent an automaton state.
c    -( b^{1, 91}_2 ∧  b^{1, 91}_1 ∧  b^{1, 91}_0 ∧ true) 
c  in CNF:
c    -b^{1, 91}_2 ∨ -b^{1, 91}_1 ∨ -b^{1, 91}_0 ∨ false 
c  in DIMACS:
-1433 -1434 -1435  0

c i = 92
c  -2+1 --> -1
c    ( b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧  p_92) -> ( b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0)
c  in CNF:
c    -b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨  b^{1, 93}_2
c    -b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_1
c    -b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨  b^{1, 93}_0
c  in DIMACS:
-1436 -1437  1438 -92  1439 0
-1436 -1437  1438 -92 -1440 0
-1436 -1437  1438 -92  1441 0

c  -1+1 --> 0
c    ( b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0 ∧  p_92) -> (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧ -b^{1, 93}_0)
c  in CNF:
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_2
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_1
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_0
c  in DIMACS:
-1436  1437 -1438 -92 -1439 0
-1436  1437 -1438 -92 -1440 0
-1436  1437 -1438 -92 -1441 0

c  0+1 --> 1
c    (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧  p_92) -> (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0)
c  in CNF:
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_2
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_1
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨  b^{1, 93}_0
c  in DIMACS:
 1436  1437  1438 -92 -1439 0
 1436  1437  1438 -92 -1440 0
 1436  1437  1438 -92  1441 0

c  1+1 --> 2
c    (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0 ∧  p_92) -> (-b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0)
c  in CNF:
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_2
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨  b^{1, 93}_1
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ -p_92 ∨ -b^{1, 93}_0
c  in DIMACS:
 1436  1437 -1438 -92 -1439 0
 1436  1437 -1438 -92  1440 0
 1436  1437 -1438 -92 -1441 0

c  2+1 --> break 
c    (-b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧  p_92) -> break
c  in CNF:
c     b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 1436 -1437  1438 -92 1162 0


c  2-1 --> 1
c    (-b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧ -p_92) -> (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0)
c  in CNF:
c     b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_2
c     b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_1
c     b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨  b^{1, 93}_0
c  in DIMACS:
 1436 -1437  1438  92 -1439 0
 1436 -1437  1438  92 -1440 0
 1436 -1437  1438  92  1441 0

c  1-1 --> 0
c    (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0 ∧ -p_92) -> (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧ -b^{1, 93}_0)
c  in CNF:
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_2
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_1
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_0
c  in DIMACS:
 1436  1437 -1438  92 -1439 0
 1436  1437 -1438  92 -1440 0
 1436  1437 -1438  92 -1441 0

c  0-1 --> -1
c    (-b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧ -p_92) -> ( b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0)
c  in CNF:
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨  b^{1, 93}_2
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_1
c     b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨  b^{1, 93}_0
c  in DIMACS:
 1436  1437  1438  92  1439 0
 1436  1437  1438  92 -1440 0
 1436  1437  1438  92  1441 0

c  -1-1 --> -2
c    ( b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧  b^{1, 92}_0 ∧ -p_92) -> ( b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0)
c  in CNF:
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨  b^{1, 93}_2
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨  b^{1, 93}_1
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨  p_92 ∨ -b^{1, 93}_0
c  in DIMACS:
-1436  1437 -1438  92  1439 0
-1436  1437 -1438  92  1440 0
-1436  1437 -1438  92 -1441 0

c  -2-1 --> break 
c    ( b^{1, 92}_2 ∧  b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨  b^{1, 92}_0 ∨  p_92 ∨ break
c  in DIMACS:
-1436 -1437  1438  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 92}_2 ∧ -b^{1, 92}_1 ∧ -b^{1, 92}_0 ∧ true) 
c  in CNF:
c    -b^{1, 92}_2 ∨  b^{1, 92}_1 ∨  b^{1, 92}_0 ∨ false 
c  in DIMACS:
-1436  1437  1438  0

c  3 does not represent an automaton state.
c    -(-b^{1, 92}_2 ∧  b^{1, 92}_1 ∧  b^{1, 92}_0 ∧ true) 
c  in CNF:
c     b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ false 
c  in DIMACS:
 1436 -1437 -1438  0
c  -3 does not represent an automaton state.
c    -( b^{1, 92}_2 ∧  b^{1, 92}_1 ∧  b^{1, 92}_0 ∧ true) 
c  in CNF:
c    -b^{1, 92}_2 ∨ -b^{1, 92}_1 ∨ -b^{1, 92}_0 ∨ false 
c  in DIMACS:
-1436 -1437 -1438  0

c i = 93
c  -2+1 --> -1
c    ( b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧  p_93) -> ( b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0)
c  in CNF:
c    -b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨  b^{1, 94}_2
c    -b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_1
c    -b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨  b^{1, 94}_0
c  in DIMACS:
-1439 -1440  1441 -93  1442 0
-1439 -1440  1441 -93 -1443 0
-1439 -1440  1441 -93  1444 0

c  -1+1 --> 0
c    ( b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0 ∧  p_93) -> (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧ -b^{1, 94}_0)
c  in CNF:
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_2
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_1
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_0
c  in DIMACS:
-1439  1440 -1441 -93 -1442 0
-1439  1440 -1441 -93 -1443 0
-1439  1440 -1441 -93 -1444 0

c  0+1 --> 1
c    (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧  p_93) -> (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0)
c  in CNF:
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_2
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_1
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨  b^{1, 94}_0
c  in DIMACS:
 1439  1440  1441 -93 -1442 0
 1439  1440  1441 -93 -1443 0
 1439  1440  1441 -93  1444 0

c  1+1 --> 2
c    (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0 ∧  p_93) -> (-b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0)
c  in CNF:
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_2
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨  b^{1, 94}_1
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ -p_93 ∨ -b^{1, 94}_0
c  in DIMACS:
 1439  1440 -1441 -93 -1442 0
 1439  1440 -1441 -93  1443 0
 1439  1440 -1441 -93 -1444 0

c  2+1 --> break 
c    (-b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧  p_93) -> break
c  in CNF:
c     b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ -p_93 ∨ break
c  in DIMACS:
 1439 -1440  1441 -93 1162 0


c  2-1 --> 1
c    (-b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧ -p_93) -> (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0)
c  in CNF:
c     b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_2
c     b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_1
c     b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨  b^{1, 94}_0
c  in DIMACS:
 1439 -1440  1441  93 -1442 0
 1439 -1440  1441  93 -1443 0
 1439 -1440  1441  93  1444 0

c  1-1 --> 0
c    (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0 ∧ -p_93) -> (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧ -b^{1, 94}_0)
c  in CNF:
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_2
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_1
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_0
c  in DIMACS:
 1439  1440 -1441  93 -1442 0
 1439  1440 -1441  93 -1443 0
 1439  1440 -1441  93 -1444 0

c  0-1 --> -1
c    (-b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧ -p_93) -> ( b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0)
c  in CNF:
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨  b^{1, 94}_2
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_1
c     b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨  b^{1, 94}_0
c  in DIMACS:
 1439  1440  1441  93  1442 0
 1439  1440  1441  93 -1443 0
 1439  1440  1441  93  1444 0

c  -1-1 --> -2
c    ( b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧  b^{1, 93}_0 ∧ -p_93) -> ( b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0)
c  in CNF:
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨  b^{1, 94}_2
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨  b^{1, 94}_1
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨  p_93 ∨ -b^{1, 94}_0
c  in DIMACS:
-1439  1440 -1441  93  1442 0
-1439  1440 -1441  93  1443 0
-1439  1440 -1441  93 -1444 0

c  -2-1 --> break 
c    ( b^{1, 93}_2 ∧  b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧ -p_93) -> break
c  in CNF:
c    -b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨  b^{1, 93}_0 ∨  p_93 ∨ break
c  in DIMACS:
-1439 -1440  1441  93 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 93}_2 ∧ -b^{1, 93}_1 ∧ -b^{1, 93}_0 ∧ true) 
c  in CNF:
c    -b^{1, 93}_2 ∨  b^{1, 93}_1 ∨  b^{1, 93}_0 ∨ false 
c  in DIMACS:
-1439  1440  1441  0

c  3 does not represent an automaton state.
c    -(-b^{1, 93}_2 ∧  b^{1, 93}_1 ∧  b^{1, 93}_0 ∧ true) 
c  in CNF:
c     b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ false 
c  in DIMACS:
 1439 -1440 -1441  0
c  -3 does not represent an automaton state.
c    -( b^{1, 93}_2 ∧  b^{1, 93}_1 ∧  b^{1, 93}_0 ∧ true) 
c  in CNF:
c    -b^{1, 93}_2 ∨ -b^{1, 93}_1 ∨ -b^{1, 93}_0 ∨ false 
c  in DIMACS:
-1439 -1440 -1441  0

c i = 94
c  -2+1 --> -1
c    ( b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧  p_94) -> ( b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0)
c  in CNF:
c    -b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨  b^{1, 95}_2
c    -b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_1
c    -b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨  b^{1, 95}_0
c  in DIMACS:
-1442 -1443  1444 -94  1445 0
-1442 -1443  1444 -94 -1446 0
-1442 -1443  1444 -94  1447 0

c  -1+1 --> 0
c    ( b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0 ∧  p_94) -> (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧ -b^{1, 95}_0)
c  in CNF:
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_2
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_1
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_0
c  in DIMACS:
-1442  1443 -1444 -94 -1445 0
-1442  1443 -1444 -94 -1446 0
-1442  1443 -1444 -94 -1447 0

c  0+1 --> 1
c    (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧  p_94) -> (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0)
c  in CNF:
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_2
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_1
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨  b^{1, 95}_0
c  in DIMACS:
 1442  1443  1444 -94 -1445 0
 1442  1443  1444 -94 -1446 0
 1442  1443  1444 -94  1447 0

c  1+1 --> 2
c    (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0 ∧  p_94) -> (-b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0)
c  in CNF:
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_2
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨  b^{1, 95}_1
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ -p_94 ∨ -b^{1, 95}_0
c  in DIMACS:
 1442  1443 -1444 -94 -1445 0
 1442  1443 -1444 -94  1446 0
 1442  1443 -1444 -94 -1447 0

c  2+1 --> break 
c    (-b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧  p_94) -> break
c  in CNF:
c     b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ -p_94 ∨ break
c  in DIMACS:
 1442 -1443  1444 -94 1162 0


c  2-1 --> 1
c    (-b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧ -p_94) -> (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0)
c  in CNF:
c     b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_2
c     b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_1
c     b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨  b^{1, 95}_0
c  in DIMACS:
 1442 -1443  1444  94 -1445 0
 1442 -1443  1444  94 -1446 0
 1442 -1443  1444  94  1447 0

c  1-1 --> 0
c    (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0 ∧ -p_94) -> (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧ -b^{1, 95}_0)
c  in CNF:
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_2
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_1
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_0
c  in DIMACS:
 1442  1443 -1444  94 -1445 0
 1442  1443 -1444  94 -1446 0
 1442  1443 -1444  94 -1447 0

c  0-1 --> -1
c    (-b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧ -p_94) -> ( b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0)
c  in CNF:
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨  b^{1, 95}_2
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_1
c     b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨  b^{1, 95}_0
c  in DIMACS:
 1442  1443  1444  94  1445 0
 1442  1443  1444  94 -1446 0
 1442  1443  1444  94  1447 0

c  -1-1 --> -2
c    ( b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧  b^{1, 94}_0 ∧ -p_94) -> ( b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0)
c  in CNF:
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨  b^{1, 95}_2
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨  b^{1, 95}_1
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨  p_94 ∨ -b^{1, 95}_0
c  in DIMACS:
-1442  1443 -1444  94  1445 0
-1442  1443 -1444  94  1446 0
-1442  1443 -1444  94 -1447 0

c  -2-1 --> break 
c    ( b^{1, 94}_2 ∧  b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧ -p_94) -> break
c  in CNF:
c    -b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨  b^{1, 94}_0 ∨  p_94 ∨ break
c  in DIMACS:
-1442 -1443  1444  94 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 94}_2 ∧ -b^{1, 94}_1 ∧ -b^{1, 94}_0 ∧ true) 
c  in CNF:
c    -b^{1, 94}_2 ∨  b^{1, 94}_1 ∨  b^{1, 94}_0 ∨ false 
c  in DIMACS:
-1442  1443  1444  0

c  3 does not represent an automaton state.
c    -(-b^{1, 94}_2 ∧  b^{1, 94}_1 ∧  b^{1, 94}_0 ∧ true) 
c  in CNF:
c     b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ false 
c  in DIMACS:
 1442 -1443 -1444  0
c  -3 does not represent an automaton state.
c    -( b^{1, 94}_2 ∧  b^{1, 94}_1 ∧  b^{1, 94}_0 ∧ true) 
c  in CNF:
c    -b^{1, 94}_2 ∨ -b^{1, 94}_1 ∨ -b^{1, 94}_0 ∨ false 
c  in DIMACS:
-1442 -1443 -1444  0

c i = 95
c  -2+1 --> -1
c    ( b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧  p_95) -> ( b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0)
c  in CNF:
c    -b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨  b^{1, 96}_2
c    -b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_1
c    -b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨  b^{1, 96}_0
c  in DIMACS:
-1445 -1446  1447 -95  1448 0
-1445 -1446  1447 -95 -1449 0
-1445 -1446  1447 -95  1450 0

c  -1+1 --> 0
c    ( b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0 ∧  p_95) -> (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧ -b^{1, 96}_0)
c  in CNF:
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_2
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_1
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_0
c  in DIMACS:
-1445  1446 -1447 -95 -1448 0
-1445  1446 -1447 -95 -1449 0
-1445  1446 -1447 -95 -1450 0

c  0+1 --> 1
c    (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧  p_95) -> (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0)
c  in CNF:
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_2
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_1
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨  b^{1, 96}_0
c  in DIMACS:
 1445  1446  1447 -95 -1448 0
 1445  1446  1447 -95 -1449 0
 1445  1446  1447 -95  1450 0

c  1+1 --> 2
c    (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0 ∧  p_95) -> (-b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0)
c  in CNF:
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_2
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨  b^{1, 96}_1
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ -p_95 ∨ -b^{1, 96}_0
c  in DIMACS:
 1445  1446 -1447 -95 -1448 0
 1445  1446 -1447 -95  1449 0
 1445  1446 -1447 -95 -1450 0

c  2+1 --> break 
c    (-b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧  p_95) -> break
c  in CNF:
c     b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ -p_95 ∨ break
c  in DIMACS:
 1445 -1446  1447 -95 1162 0


c  2-1 --> 1
c    (-b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧ -p_95) -> (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0)
c  in CNF:
c     b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_2
c     b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_1
c     b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨  b^{1, 96}_0
c  in DIMACS:
 1445 -1446  1447  95 -1448 0
 1445 -1446  1447  95 -1449 0
 1445 -1446  1447  95  1450 0

c  1-1 --> 0
c    (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0 ∧ -p_95) -> (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧ -b^{1, 96}_0)
c  in CNF:
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_2
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_1
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_0
c  in DIMACS:
 1445  1446 -1447  95 -1448 0
 1445  1446 -1447  95 -1449 0
 1445  1446 -1447  95 -1450 0

c  0-1 --> -1
c    (-b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧ -p_95) -> ( b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0)
c  in CNF:
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨  b^{1, 96}_2
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_1
c     b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨  b^{1, 96}_0
c  in DIMACS:
 1445  1446  1447  95  1448 0
 1445  1446  1447  95 -1449 0
 1445  1446  1447  95  1450 0

c  -1-1 --> -2
c    ( b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧  b^{1, 95}_0 ∧ -p_95) -> ( b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0)
c  in CNF:
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨  b^{1, 96}_2
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨  b^{1, 96}_1
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨  p_95 ∨ -b^{1, 96}_0
c  in DIMACS:
-1445  1446 -1447  95  1448 0
-1445  1446 -1447  95  1449 0
-1445  1446 -1447  95 -1450 0

c  -2-1 --> break 
c    ( b^{1, 95}_2 ∧  b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧ -p_95) -> break
c  in CNF:
c    -b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨  b^{1, 95}_0 ∨  p_95 ∨ break
c  in DIMACS:
-1445 -1446  1447  95 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 95}_2 ∧ -b^{1, 95}_1 ∧ -b^{1, 95}_0 ∧ true) 
c  in CNF:
c    -b^{1, 95}_2 ∨  b^{1, 95}_1 ∨  b^{1, 95}_0 ∨ false 
c  in DIMACS:
-1445  1446  1447  0

c  3 does not represent an automaton state.
c    -(-b^{1, 95}_2 ∧  b^{1, 95}_1 ∧  b^{1, 95}_0 ∧ true) 
c  in CNF:
c     b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ false 
c  in DIMACS:
 1445 -1446 -1447  0
c  -3 does not represent an automaton state.
c    -( b^{1, 95}_2 ∧  b^{1, 95}_1 ∧  b^{1, 95}_0 ∧ true) 
c  in CNF:
c    -b^{1, 95}_2 ∨ -b^{1, 95}_1 ∨ -b^{1, 95}_0 ∨ false 
c  in DIMACS:
-1445 -1446 -1447  0

c i = 96
c  -2+1 --> -1
c    ( b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧  p_96) -> ( b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0)
c  in CNF:
c    -b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨  b^{1, 97}_2
c    -b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_1
c    -b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨  b^{1, 97}_0
c  in DIMACS:
-1448 -1449  1450 -96  1451 0
-1448 -1449  1450 -96 -1452 0
-1448 -1449  1450 -96  1453 0

c  -1+1 --> 0
c    ( b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0 ∧  p_96) -> (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧ -b^{1, 97}_0)
c  in CNF:
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_2
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_1
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_0
c  in DIMACS:
-1448  1449 -1450 -96 -1451 0
-1448  1449 -1450 -96 -1452 0
-1448  1449 -1450 -96 -1453 0

c  0+1 --> 1
c    (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧  p_96) -> (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0)
c  in CNF:
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_2
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_1
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨  b^{1, 97}_0
c  in DIMACS:
 1448  1449  1450 -96 -1451 0
 1448  1449  1450 -96 -1452 0
 1448  1449  1450 -96  1453 0

c  1+1 --> 2
c    (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0 ∧  p_96) -> (-b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0)
c  in CNF:
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_2
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨  b^{1, 97}_1
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ -p_96 ∨ -b^{1, 97}_0
c  in DIMACS:
 1448  1449 -1450 -96 -1451 0
 1448  1449 -1450 -96  1452 0
 1448  1449 -1450 -96 -1453 0

c  2+1 --> break 
c    (-b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧  p_96) -> break
c  in CNF:
c     b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 1448 -1449  1450 -96 1162 0


c  2-1 --> 1
c    (-b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧ -p_96) -> (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0)
c  in CNF:
c     b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_2
c     b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_1
c     b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨  b^{1, 97}_0
c  in DIMACS:
 1448 -1449  1450  96 -1451 0
 1448 -1449  1450  96 -1452 0
 1448 -1449  1450  96  1453 0

c  1-1 --> 0
c    (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0 ∧ -p_96) -> (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧ -b^{1, 97}_0)
c  in CNF:
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_2
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_1
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_0
c  in DIMACS:
 1448  1449 -1450  96 -1451 0
 1448  1449 -1450  96 -1452 0
 1448  1449 -1450  96 -1453 0

c  0-1 --> -1
c    (-b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧ -p_96) -> ( b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0)
c  in CNF:
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨  b^{1, 97}_2
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_1
c     b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨  b^{1, 97}_0
c  in DIMACS:
 1448  1449  1450  96  1451 0
 1448  1449  1450  96 -1452 0
 1448  1449  1450  96  1453 0

c  -1-1 --> -2
c    ( b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧  b^{1, 96}_0 ∧ -p_96) -> ( b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0)
c  in CNF:
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨  b^{1, 97}_2
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨  b^{1, 97}_1
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨  p_96 ∨ -b^{1, 97}_0
c  in DIMACS:
-1448  1449 -1450  96  1451 0
-1448  1449 -1450  96  1452 0
-1448  1449 -1450  96 -1453 0

c  -2-1 --> break 
c    ( b^{1, 96}_2 ∧  b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨  b^{1, 96}_0 ∨  p_96 ∨ break
c  in DIMACS:
-1448 -1449  1450  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 96}_2 ∧ -b^{1, 96}_1 ∧ -b^{1, 96}_0 ∧ true) 
c  in CNF:
c    -b^{1, 96}_2 ∨  b^{1, 96}_1 ∨  b^{1, 96}_0 ∨ false 
c  in DIMACS:
-1448  1449  1450  0

c  3 does not represent an automaton state.
c    -(-b^{1, 96}_2 ∧  b^{1, 96}_1 ∧  b^{1, 96}_0 ∧ true) 
c  in CNF:
c     b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ false 
c  in DIMACS:
 1448 -1449 -1450  0
c  -3 does not represent an automaton state.
c    -( b^{1, 96}_2 ∧  b^{1, 96}_1 ∧  b^{1, 96}_0 ∧ true) 
c  in CNF:
c    -b^{1, 96}_2 ∨ -b^{1, 96}_1 ∨ -b^{1, 96}_0 ∨ false 
c  in DIMACS:
-1448 -1449 -1450  0

c i = 97
c  -2+1 --> -1
c    ( b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧  p_97) -> ( b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0)
c  in CNF:
c    -b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨  b^{1, 98}_2
c    -b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_1
c    -b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨  b^{1, 98}_0
c  in DIMACS:
-1451 -1452  1453 -97  1454 0
-1451 -1452  1453 -97 -1455 0
-1451 -1452  1453 -97  1456 0

c  -1+1 --> 0
c    ( b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0 ∧  p_97) -> (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧ -b^{1, 98}_0)
c  in CNF:
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_2
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_1
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_0
c  in DIMACS:
-1451  1452 -1453 -97 -1454 0
-1451  1452 -1453 -97 -1455 0
-1451  1452 -1453 -97 -1456 0

c  0+1 --> 1
c    (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧  p_97) -> (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0)
c  in CNF:
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_2
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_1
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨  b^{1, 98}_0
c  in DIMACS:
 1451  1452  1453 -97 -1454 0
 1451  1452  1453 -97 -1455 0
 1451  1452  1453 -97  1456 0

c  1+1 --> 2
c    (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0 ∧  p_97) -> (-b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0)
c  in CNF:
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_2
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨  b^{1, 98}_1
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ -p_97 ∨ -b^{1, 98}_0
c  in DIMACS:
 1451  1452 -1453 -97 -1454 0
 1451  1452 -1453 -97  1455 0
 1451  1452 -1453 -97 -1456 0

c  2+1 --> break 
c    (-b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧  p_97) -> break
c  in CNF:
c     b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ -p_97 ∨ break
c  in DIMACS:
 1451 -1452  1453 -97 1162 0


c  2-1 --> 1
c    (-b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧ -p_97) -> (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0)
c  in CNF:
c     b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_2
c     b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_1
c     b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨  b^{1, 98}_0
c  in DIMACS:
 1451 -1452  1453  97 -1454 0
 1451 -1452  1453  97 -1455 0
 1451 -1452  1453  97  1456 0

c  1-1 --> 0
c    (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0 ∧ -p_97) -> (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧ -b^{1, 98}_0)
c  in CNF:
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_2
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_1
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_0
c  in DIMACS:
 1451  1452 -1453  97 -1454 0
 1451  1452 -1453  97 -1455 0
 1451  1452 -1453  97 -1456 0

c  0-1 --> -1
c    (-b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧ -p_97) -> ( b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0)
c  in CNF:
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨  b^{1, 98}_2
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_1
c     b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨  b^{1, 98}_0
c  in DIMACS:
 1451  1452  1453  97  1454 0
 1451  1452  1453  97 -1455 0
 1451  1452  1453  97  1456 0

c  -1-1 --> -2
c    ( b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧  b^{1, 97}_0 ∧ -p_97) -> ( b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0)
c  in CNF:
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨  b^{1, 98}_2
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨  b^{1, 98}_1
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨  p_97 ∨ -b^{1, 98}_0
c  in DIMACS:
-1451  1452 -1453  97  1454 0
-1451  1452 -1453  97  1455 0
-1451  1452 -1453  97 -1456 0

c  -2-1 --> break 
c    ( b^{1, 97}_2 ∧  b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧ -p_97) -> break
c  in CNF:
c    -b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨  b^{1, 97}_0 ∨  p_97 ∨ break
c  in DIMACS:
-1451 -1452  1453  97 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 97}_2 ∧ -b^{1, 97}_1 ∧ -b^{1, 97}_0 ∧ true) 
c  in CNF:
c    -b^{1, 97}_2 ∨  b^{1, 97}_1 ∨  b^{1, 97}_0 ∨ false 
c  in DIMACS:
-1451  1452  1453  0

c  3 does not represent an automaton state.
c    -(-b^{1, 97}_2 ∧  b^{1, 97}_1 ∧  b^{1, 97}_0 ∧ true) 
c  in CNF:
c     b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ false 
c  in DIMACS:
 1451 -1452 -1453  0
c  -3 does not represent an automaton state.
c    -( b^{1, 97}_2 ∧  b^{1, 97}_1 ∧  b^{1, 97}_0 ∧ true) 
c  in CNF:
c    -b^{1, 97}_2 ∨ -b^{1, 97}_1 ∨ -b^{1, 97}_0 ∨ false 
c  in DIMACS:
-1451 -1452 -1453  0

c i = 98
c  -2+1 --> -1
c    ( b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧  p_98) -> ( b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0)
c  in CNF:
c    -b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨  b^{1, 99}_2
c    -b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_1
c    -b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨  b^{1, 99}_0
c  in DIMACS:
-1454 -1455  1456 -98  1457 0
-1454 -1455  1456 -98 -1458 0
-1454 -1455  1456 -98  1459 0

c  -1+1 --> 0
c    ( b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0 ∧  p_98) -> (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧ -b^{1, 99}_0)
c  in CNF:
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_2
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_1
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_0
c  in DIMACS:
-1454  1455 -1456 -98 -1457 0
-1454  1455 -1456 -98 -1458 0
-1454  1455 -1456 -98 -1459 0

c  0+1 --> 1
c    (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧  p_98) -> (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0)
c  in CNF:
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_2
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_1
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨  b^{1, 99}_0
c  in DIMACS:
 1454  1455  1456 -98 -1457 0
 1454  1455  1456 -98 -1458 0
 1454  1455  1456 -98  1459 0

c  1+1 --> 2
c    (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0 ∧  p_98) -> (-b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0)
c  in CNF:
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_2
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨  b^{1, 99}_1
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ -p_98 ∨ -b^{1, 99}_0
c  in DIMACS:
 1454  1455 -1456 -98 -1457 0
 1454  1455 -1456 -98  1458 0
 1454  1455 -1456 -98 -1459 0

c  2+1 --> break 
c    (-b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧  p_98) -> break
c  in CNF:
c     b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 1454 -1455  1456 -98 1162 0


c  2-1 --> 1
c    (-b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧ -p_98) -> (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0)
c  in CNF:
c     b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_2
c     b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_1
c     b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨  b^{1, 99}_0
c  in DIMACS:
 1454 -1455  1456  98 -1457 0
 1454 -1455  1456  98 -1458 0
 1454 -1455  1456  98  1459 0

c  1-1 --> 0
c    (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0 ∧ -p_98) -> (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧ -b^{1, 99}_0)
c  in CNF:
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_2
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_1
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_0
c  in DIMACS:
 1454  1455 -1456  98 -1457 0
 1454  1455 -1456  98 -1458 0
 1454  1455 -1456  98 -1459 0

c  0-1 --> -1
c    (-b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧ -p_98) -> ( b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0)
c  in CNF:
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨  b^{1, 99}_2
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_1
c     b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨  b^{1, 99}_0
c  in DIMACS:
 1454  1455  1456  98  1457 0
 1454  1455  1456  98 -1458 0
 1454  1455  1456  98  1459 0

c  -1-1 --> -2
c    ( b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧  b^{1, 98}_0 ∧ -p_98) -> ( b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0)
c  in CNF:
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨  b^{1, 99}_2
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨  b^{1, 99}_1
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨  p_98 ∨ -b^{1, 99}_0
c  in DIMACS:
-1454  1455 -1456  98  1457 0
-1454  1455 -1456  98  1458 0
-1454  1455 -1456  98 -1459 0

c  -2-1 --> break 
c    ( b^{1, 98}_2 ∧  b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨  b^{1, 98}_0 ∨  p_98 ∨ break
c  in DIMACS:
-1454 -1455  1456  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 98}_2 ∧ -b^{1, 98}_1 ∧ -b^{1, 98}_0 ∧ true) 
c  in CNF:
c    -b^{1, 98}_2 ∨  b^{1, 98}_1 ∨  b^{1, 98}_0 ∨ false 
c  in DIMACS:
-1454  1455  1456  0

c  3 does not represent an automaton state.
c    -(-b^{1, 98}_2 ∧  b^{1, 98}_1 ∧  b^{1, 98}_0 ∧ true) 
c  in CNF:
c     b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ false 
c  in DIMACS:
 1454 -1455 -1456  0
c  -3 does not represent an automaton state.
c    -( b^{1, 98}_2 ∧  b^{1, 98}_1 ∧  b^{1, 98}_0 ∧ true) 
c  in CNF:
c    -b^{1, 98}_2 ∨ -b^{1, 98}_1 ∨ -b^{1, 98}_0 ∨ false 
c  in DIMACS:
-1454 -1455 -1456  0

c i = 99
c  -2+1 --> -1
c    ( b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧  p_99) -> ( b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0)
c  in CNF:
c    -b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨  b^{1, 100}_2
c    -b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_1
c    -b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨  b^{1, 100}_0
c  in DIMACS:
-1457 -1458  1459 -99  1460 0
-1457 -1458  1459 -99 -1461 0
-1457 -1458  1459 -99  1462 0

c  -1+1 --> 0
c    ( b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0 ∧  p_99) -> (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧ -b^{1, 100}_0)
c  in CNF:
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_2
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_1
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_0
c  in DIMACS:
-1457  1458 -1459 -99 -1460 0
-1457  1458 -1459 -99 -1461 0
-1457  1458 -1459 -99 -1462 0

c  0+1 --> 1
c    (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧  p_99) -> (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0)
c  in CNF:
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_2
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_1
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨  b^{1, 100}_0
c  in DIMACS:
 1457  1458  1459 -99 -1460 0
 1457  1458  1459 -99 -1461 0
 1457  1458  1459 -99  1462 0

c  1+1 --> 2
c    (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0 ∧  p_99) -> (-b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0)
c  in CNF:
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_2
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨  b^{1, 100}_1
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ -p_99 ∨ -b^{1, 100}_0
c  in DIMACS:
 1457  1458 -1459 -99 -1460 0
 1457  1458 -1459 -99  1461 0
 1457  1458 -1459 -99 -1462 0

c  2+1 --> break 
c    (-b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧  p_99) -> break
c  in CNF:
c     b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 1457 -1458  1459 -99 1162 0


c  2-1 --> 1
c    (-b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧ -p_99) -> (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0)
c  in CNF:
c     b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_2
c     b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_1
c     b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨  b^{1, 100}_0
c  in DIMACS:
 1457 -1458  1459  99 -1460 0
 1457 -1458  1459  99 -1461 0
 1457 -1458  1459  99  1462 0

c  1-1 --> 0
c    (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0 ∧ -p_99) -> (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧ -b^{1, 100}_0)
c  in CNF:
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_2
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_1
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_0
c  in DIMACS:
 1457  1458 -1459  99 -1460 0
 1457  1458 -1459  99 -1461 0
 1457  1458 -1459  99 -1462 0

c  0-1 --> -1
c    (-b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧ -p_99) -> ( b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0)
c  in CNF:
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨  b^{1, 100}_2
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_1
c     b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨  b^{1, 100}_0
c  in DIMACS:
 1457  1458  1459  99  1460 0
 1457  1458  1459  99 -1461 0
 1457  1458  1459  99  1462 0

c  -1-1 --> -2
c    ( b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧  b^{1, 99}_0 ∧ -p_99) -> ( b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0)
c  in CNF:
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨  b^{1, 100}_2
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨  b^{1, 100}_1
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨  p_99 ∨ -b^{1, 100}_0
c  in DIMACS:
-1457  1458 -1459  99  1460 0
-1457  1458 -1459  99  1461 0
-1457  1458 -1459  99 -1462 0

c  -2-1 --> break 
c    ( b^{1, 99}_2 ∧  b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨  b^{1, 99}_0 ∨  p_99 ∨ break
c  in DIMACS:
-1457 -1458  1459  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 99}_2 ∧ -b^{1, 99}_1 ∧ -b^{1, 99}_0 ∧ true) 
c  in CNF:
c    -b^{1, 99}_2 ∨  b^{1, 99}_1 ∨  b^{1, 99}_0 ∨ false 
c  in DIMACS:
-1457  1458  1459  0

c  3 does not represent an automaton state.
c    -(-b^{1, 99}_2 ∧  b^{1, 99}_1 ∧  b^{1, 99}_0 ∧ true) 
c  in CNF:
c     b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ false 
c  in DIMACS:
 1457 -1458 -1459  0
c  -3 does not represent an automaton state.
c    -( b^{1, 99}_2 ∧  b^{1, 99}_1 ∧  b^{1, 99}_0 ∧ true) 
c  in CNF:
c    -b^{1, 99}_2 ∨ -b^{1, 99}_1 ∨ -b^{1, 99}_0 ∨ false 
c  in DIMACS:
-1457 -1458 -1459  0

c i = 100
c  -2+1 --> -1
c    ( b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧  p_100) -> ( b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0)
c  in CNF:
c    -b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨  b^{1, 101}_2
c    -b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_1
c    -b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨  b^{1, 101}_0
c  in DIMACS:
-1460 -1461  1462 -100  1463 0
-1460 -1461  1462 -100 -1464 0
-1460 -1461  1462 -100  1465 0

c  -1+1 --> 0
c    ( b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0 ∧  p_100) -> (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧ -b^{1, 101}_0)
c  in CNF:
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_2
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_1
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_0
c  in DIMACS:
-1460  1461 -1462 -100 -1463 0
-1460  1461 -1462 -100 -1464 0
-1460  1461 -1462 -100 -1465 0

c  0+1 --> 1
c    (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧  p_100) -> (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0)
c  in CNF:
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_2
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_1
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨  b^{1, 101}_0
c  in DIMACS:
 1460  1461  1462 -100 -1463 0
 1460  1461  1462 -100 -1464 0
 1460  1461  1462 -100  1465 0

c  1+1 --> 2
c    (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0 ∧  p_100) -> (-b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0)
c  in CNF:
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_2
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨  b^{1, 101}_1
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ -p_100 ∨ -b^{1, 101}_0
c  in DIMACS:
 1460  1461 -1462 -100 -1463 0
 1460  1461 -1462 -100  1464 0
 1460  1461 -1462 -100 -1465 0

c  2+1 --> break 
c    (-b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧  p_100) -> break
c  in CNF:
c     b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 1460 -1461  1462 -100 1162 0


c  2-1 --> 1
c    (-b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧ -p_100) -> (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0)
c  in CNF:
c     b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_2
c     b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_1
c     b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨  b^{1, 101}_0
c  in DIMACS:
 1460 -1461  1462  100 -1463 0
 1460 -1461  1462  100 -1464 0
 1460 -1461  1462  100  1465 0

c  1-1 --> 0
c    (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0 ∧ -p_100) -> (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧ -b^{1, 101}_0)
c  in CNF:
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_2
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_1
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_0
c  in DIMACS:
 1460  1461 -1462  100 -1463 0
 1460  1461 -1462  100 -1464 0
 1460  1461 -1462  100 -1465 0

c  0-1 --> -1
c    (-b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧ -p_100) -> ( b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0)
c  in CNF:
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨  b^{1, 101}_2
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_1
c     b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨  b^{1, 101}_0
c  in DIMACS:
 1460  1461  1462  100  1463 0
 1460  1461  1462  100 -1464 0
 1460  1461  1462  100  1465 0

c  -1-1 --> -2
c    ( b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧  b^{1, 100}_0 ∧ -p_100) -> ( b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0)
c  in CNF:
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨  b^{1, 101}_2
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨  b^{1, 101}_1
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨  p_100 ∨ -b^{1, 101}_0
c  in DIMACS:
-1460  1461 -1462  100  1463 0
-1460  1461 -1462  100  1464 0
-1460  1461 -1462  100 -1465 0

c  -2-1 --> break 
c    ( b^{1, 100}_2 ∧  b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨  b^{1, 100}_0 ∨  p_100 ∨ break
c  in DIMACS:
-1460 -1461  1462  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 100}_2 ∧ -b^{1, 100}_1 ∧ -b^{1, 100}_0 ∧ true) 
c  in CNF:
c    -b^{1, 100}_2 ∨  b^{1, 100}_1 ∨  b^{1, 100}_0 ∨ false 
c  in DIMACS:
-1460  1461  1462  0

c  3 does not represent an automaton state.
c    -(-b^{1, 100}_2 ∧  b^{1, 100}_1 ∧  b^{1, 100}_0 ∧ true) 
c  in CNF:
c     b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ false 
c  in DIMACS:
 1460 -1461 -1462  0
c  -3 does not represent an automaton state.
c    -( b^{1, 100}_2 ∧  b^{1, 100}_1 ∧  b^{1, 100}_0 ∧ true) 
c  in CNF:
c    -b^{1, 100}_2 ∨ -b^{1, 100}_1 ∨ -b^{1, 100}_0 ∨ false 
c  in DIMACS:
-1460 -1461 -1462  0

c i = 101
c  -2+1 --> -1
c    ( b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧  p_101) -> ( b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0)
c  in CNF:
c    -b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨  b^{1, 102}_2
c    -b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_1
c    -b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨  b^{1, 102}_0
c  in DIMACS:
-1463 -1464  1465 -101  1466 0
-1463 -1464  1465 -101 -1467 0
-1463 -1464  1465 -101  1468 0

c  -1+1 --> 0
c    ( b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0 ∧  p_101) -> (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧ -b^{1, 102}_0)
c  in CNF:
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_2
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_1
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_0
c  in DIMACS:
-1463  1464 -1465 -101 -1466 0
-1463  1464 -1465 -101 -1467 0
-1463  1464 -1465 -101 -1468 0

c  0+1 --> 1
c    (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧  p_101) -> (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0)
c  in CNF:
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_2
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_1
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨  b^{1, 102}_0
c  in DIMACS:
 1463  1464  1465 -101 -1466 0
 1463  1464  1465 -101 -1467 0
 1463  1464  1465 -101  1468 0

c  1+1 --> 2
c    (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0 ∧  p_101) -> (-b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0)
c  in CNF:
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_2
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨  b^{1, 102}_1
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ -p_101 ∨ -b^{1, 102}_0
c  in DIMACS:
 1463  1464 -1465 -101 -1466 0
 1463  1464 -1465 -101  1467 0
 1463  1464 -1465 -101 -1468 0

c  2+1 --> break 
c    (-b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧  p_101) -> break
c  in CNF:
c     b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ -p_101 ∨ break
c  in DIMACS:
 1463 -1464  1465 -101 1162 0


c  2-1 --> 1
c    (-b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧ -p_101) -> (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0)
c  in CNF:
c     b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_2
c     b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_1
c     b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨  b^{1, 102}_0
c  in DIMACS:
 1463 -1464  1465  101 -1466 0
 1463 -1464  1465  101 -1467 0
 1463 -1464  1465  101  1468 0

c  1-1 --> 0
c    (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0 ∧ -p_101) -> (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧ -b^{1, 102}_0)
c  in CNF:
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_2
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_1
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_0
c  in DIMACS:
 1463  1464 -1465  101 -1466 0
 1463  1464 -1465  101 -1467 0
 1463  1464 -1465  101 -1468 0

c  0-1 --> -1
c    (-b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧ -p_101) -> ( b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0)
c  in CNF:
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨  b^{1, 102}_2
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_1
c     b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨  b^{1, 102}_0
c  in DIMACS:
 1463  1464  1465  101  1466 0
 1463  1464  1465  101 -1467 0
 1463  1464  1465  101  1468 0

c  -1-1 --> -2
c    ( b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧  b^{1, 101}_0 ∧ -p_101) -> ( b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0)
c  in CNF:
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨  b^{1, 102}_2
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨  b^{1, 102}_1
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨  p_101 ∨ -b^{1, 102}_0
c  in DIMACS:
-1463  1464 -1465  101  1466 0
-1463  1464 -1465  101  1467 0
-1463  1464 -1465  101 -1468 0

c  -2-1 --> break 
c    ( b^{1, 101}_2 ∧  b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧ -p_101) -> break
c  in CNF:
c    -b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨  b^{1, 101}_0 ∨  p_101 ∨ break
c  in DIMACS:
-1463 -1464  1465  101 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 101}_2 ∧ -b^{1, 101}_1 ∧ -b^{1, 101}_0 ∧ true) 
c  in CNF:
c    -b^{1, 101}_2 ∨  b^{1, 101}_1 ∨  b^{1, 101}_0 ∨ false 
c  in DIMACS:
-1463  1464  1465  0

c  3 does not represent an automaton state.
c    -(-b^{1, 101}_2 ∧  b^{1, 101}_1 ∧  b^{1, 101}_0 ∧ true) 
c  in CNF:
c     b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ false 
c  in DIMACS:
 1463 -1464 -1465  0
c  -3 does not represent an automaton state.
c    -( b^{1, 101}_2 ∧  b^{1, 101}_1 ∧  b^{1, 101}_0 ∧ true) 
c  in CNF:
c    -b^{1, 101}_2 ∨ -b^{1, 101}_1 ∨ -b^{1, 101}_0 ∨ false 
c  in DIMACS:
-1463 -1464 -1465  0

c i = 102
c  -2+1 --> -1
c    ( b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧  p_102) -> ( b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0)
c  in CNF:
c    -b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨  b^{1, 103}_2
c    -b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_1
c    -b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨  b^{1, 103}_0
c  in DIMACS:
-1466 -1467  1468 -102  1469 0
-1466 -1467  1468 -102 -1470 0
-1466 -1467  1468 -102  1471 0

c  -1+1 --> 0
c    ( b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0 ∧  p_102) -> (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧ -b^{1, 103}_0)
c  in CNF:
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_2
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_1
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_0
c  in DIMACS:
-1466  1467 -1468 -102 -1469 0
-1466  1467 -1468 -102 -1470 0
-1466  1467 -1468 -102 -1471 0

c  0+1 --> 1
c    (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧  p_102) -> (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0)
c  in CNF:
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_2
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_1
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨  b^{1, 103}_0
c  in DIMACS:
 1466  1467  1468 -102 -1469 0
 1466  1467  1468 -102 -1470 0
 1466  1467  1468 -102  1471 0

c  1+1 --> 2
c    (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0 ∧  p_102) -> (-b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0)
c  in CNF:
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_2
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨  b^{1, 103}_1
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ -p_102 ∨ -b^{1, 103}_0
c  in DIMACS:
 1466  1467 -1468 -102 -1469 0
 1466  1467 -1468 -102  1470 0
 1466  1467 -1468 -102 -1471 0

c  2+1 --> break 
c    (-b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧  p_102) -> break
c  in CNF:
c     b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 1466 -1467  1468 -102 1162 0


c  2-1 --> 1
c    (-b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧ -p_102) -> (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0)
c  in CNF:
c     b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_2
c     b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_1
c     b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨  b^{1, 103}_0
c  in DIMACS:
 1466 -1467  1468  102 -1469 0
 1466 -1467  1468  102 -1470 0
 1466 -1467  1468  102  1471 0

c  1-1 --> 0
c    (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0 ∧ -p_102) -> (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧ -b^{1, 103}_0)
c  in CNF:
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_2
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_1
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_0
c  in DIMACS:
 1466  1467 -1468  102 -1469 0
 1466  1467 -1468  102 -1470 0
 1466  1467 -1468  102 -1471 0

c  0-1 --> -1
c    (-b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧ -p_102) -> ( b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0)
c  in CNF:
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨  b^{1, 103}_2
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_1
c     b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨  b^{1, 103}_0
c  in DIMACS:
 1466  1467  1468  102  1469 0
 1466  1467  1468  102 -1470 0
 1466  1467  1468  102  1471 0

c  -1-1 --> -2
c    ( b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧  b^{1, 102}_0 ∧ -p_102) -> ( b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0)
c  in CNF:
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨  b^{1, 103}_2
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨  b^{1, 103}_1
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨  p_102 ∨ -b^{1, 103}_0
c  in DIMACS:
-1466  1467 -1468  102  1469 0
-1466  1467 -1468  102  1470 0
-1466  1467 -1468  102 -1471 0

c  -2-1 --> break 
c    ( b^{1, 102}_2 ∧  b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨  b^{1, 102}_0 ∨  p_102 ∨ break
c  in DIMACS:
-1466 -1467  1468  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 102}_2 ∧ -b^{1, 102}_1 ∧ -b^{1, 102}_0 ∧ true) 
c  in CNF:
c    -b^{1, 102}_2 ∨  b^{1, 102}_1 ∨  b^{1, 102}_0 ∨ false 
c  in DIMACS:
-1466  1467  1468  0

c  3 does not represent an automaton state.
c    -(-b^{1, 102}_2 ∧  b^{1, 102}_1 ∧  b^{1, 102}_0 ∧ true) 
c  in CNF:
c     b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ false 
c  in DIMACS:
 1466 -1467 -1468  0
c  -3 does not represent an automaton state.
c    -( b^{1, 102}_2 ∧  b^{1, 102}_1 ∧  b^{1, 102}_0 ∧ true) 
c  in CNF:
c    -b^{1, 102}_2 ∨ -b^{1, 102}_1 ∨ -b^{1, 102}_0 ∨ false 
c  in DIMACS:
-1466 -1467 -1468  0

c i = 103
c  -2+1 --> -1
c    ( b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧  p_103) -> ( b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0)
c  in CNF:
c    -b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨  b^{1, 104}_2
c    -b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_1
c    -b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨  b^{1, 104}_0
c  in DIMACS:
-1469 -1470  1471 -103  1472 0
-1469 -1470  1471 -103 -1473 0
-1469 -1470  1471 -103  1474 0

c  -1+1 --> 0
c    ( b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0 ∧  p_103) -> (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧ -b^{1, 104}_0)
c  in CNF:
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_2
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_1
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_0
c  in DIMACS:
-1469  1470 -1471 -103 -1472 0
-1469  1470 -1471 -103 -1473 0
-1469  1470 -1471 -103 -1474 0

c  0+1 --> 1
c    (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧  p_103) -> (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0)
c  in CNF:
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_2
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_1
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨  b^{1, 104}_0
c  in DIMACS:
 1469  1470  1471 -103 -1472 0
 1469  1470  1471 -103 -1473 0
 1469  1470  1471 -103  1474 0

c  1+1 --> 2
c    (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0 ∧  p_103) -> (-b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0)
c  in CNF:
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_2
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨  b^{1, 104}_1
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ -p_103 ∨ -b^{1, 104}_0
c  in DIMACS:
 1469  1470 -1471 -103 -1472 0
 1469  1470 -1471 -103  1473 0
 1469  1470 -1471 -103 -1474 0

c  2+1 --> break 
c    (-b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧  p_103) -> break
c  in CNF:
c     b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ -p_103 ∨ break
c  in DIMACS:
 1469 -1470  1471 -103 1162 0


c  2-1 --> 1
c    (-b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧ -p_103) -> (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0)
c  in CNF:
c     b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_2
c     b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_1
c     b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨  b^{1, 104}_0
c  in DIMACS:
 1469 -1470  1471  103 -1472 0
 1469 -1470  1471  103 -1473 0
 1469 -1470  1471  103  1474 0

c  1-1 --> 0
c    (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0 ∧ -p_103) -> (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧ -b^{1, 104}_0)
c  in CNF:
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_2
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_1
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_0
c  in DIMACS:
 1469  1470 -1471  103 -1472 0
 1469  1470 -1471  103 -1473 0
 1469  1470 -1471  103 -1474 0

c  0-1 --> -1
c    (-b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧ -p_103) -> ( b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0)
c  in CNF:
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨  b^{1, 104}_2
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_1
c     b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨  b^{1, 104}_0
c  in DIMACS:
 1469  1470  1471  103  1472 0
 1469  1470  1471  103 -1473 0
 1469  1470  1471  103  1474 0

c  -1-1 --> -2
c    ( b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧  b^{1, 103}_0 ∧ -p_103) -> ( b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0)
c  in CNF:
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨  b^{1, 104}_2
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨  b^{1, 104}_1
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨  p_103 ∨ -b^{1, 104}_0
c  in DIMACS:
-1469  1470 -1471  103  1472 0
-1469  1470 -1471  103  1473 0
-1469  1470 -1471  103 -1474 0

c  -2-1 --> break 
c    ( b^{1, 103}_2 ∧  b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧ -p_103) -> break
c  in CNF:
c    -b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨  b^{1, 103}_0 ∨  p_103 ∨ break
c  in DIMACS:
-1469 -1470  1471  103 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 103}_2 ∧ -b^{1, 103}_1 ∧ -b^{1, 103}_0 ∧ true) 
c  in CNF:
c    -b^{1, 103}_2 ∨  b^{1, 103}_1 ∨  b^{1, 103}_0 ∨ false 
c  in DIMACS:
-1469  1470  1471  0

c  3 does not represent an automaton state.
c    -(-b^{1, 103}_2 ∧  b^{1, 103}_1 ∧  b^{1, 103}_0 ∧ true) 
c  in CNF:
c     b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ false 
c  in DIMACS:
 1469 -1470 -1471  0
c  -3 does not represent an automaton state.
c    -( b^{1, 103}_2 ∧  b^{1, 103}_1 ∧  b^{1, 103}_0 ∧ true) 
c  in CNF:
c    -b^{1, 103}_2 ∨ -b^{1, 103}_1 ∨ -b^{1, 103}_0 ∨ false 
c  in DIMACS:
-1469 -1470 -1471  0

c i = 104
c  -2+1 --> -1
c    ( b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧  p_104) -> ( b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0)
c  in CNF:
c    -b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨  b^{1, 105}_2
c    -b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_1
c    -b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨  b^{1, 105}_0
c  in DIMACS:
-1472 -1473  1474 -104  1475 0
-1472 -1473  1474 -104 -1476 0
-1472 -1473  1474 -104  1477 0

c  -1+1 --> 0
c    ( b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0 ∧  p_104) -> (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧ -b^{1, 105}_0)
c  in CNF:
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_2
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_1
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_0
c  in DIMACS:
-1472  1473 -1474 -104 -1475 0
-1472  1473 -1474 -104 -1476 0
-1472  1473 -1474 -104 -1477 0

c  0+1 --> 1
c    (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧  p_104) -> (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0)
c  in CNF:
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_2
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_1
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨  b^{1, 105}_0
c  in DIMACS:
 1472  1473  1474 -104 -1475 0
 1472  1473  1474 -104 -1476 0
 1472  1473  1474 -104  1477 0

c  1+1 --> 2
c    (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0 ∧  p_104) -> (-b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0)
c  in CNF:
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_2
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨  b^{1, 105}_1
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ -p_104 ∨ -b^{1, 105}_0
c  in DIMACS:
 1472  1473 -1474 -104 -1475 0
 1472  1473 -1474 -104  1476 0
 1472  1473 -1474 -104 -1477 0

c  2+1 --> break 
c    (-b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧  p_104) -> break
c  in CNF:
c     b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 1472 -1473  1474 -104 1162 0


c  2-1 --> 1
c    (-b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧ -p_104) -> (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0)
c  in CNF:
c     b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_2
c     b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_1
c     b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨  b^{1, 105}_0
c  in DIMACS:
 1472 -1473  1474  104 -1475 0
 1472 -1473  1474  104 -1476 0
 1472 -1473  1474  104  1477 0

c  1-1 --> 0
c    (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0 ∧ -p_104) -> (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧ -b^{1, 105}_0)
c  in CNF:
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_2
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_1
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_0
c  in DIMACS:
 1472  1473 -1474  104 -1475 0
 1472  1473 -1474  104 -1476 0
 1472  1473 -1474  104 -1477 0

c  0-1 --> -1
c    (-b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧ -p_104) -> ( b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0)
c  in CNF:
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨  b^{1, 105}_2
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_1
c     b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨  b^{1, 105}_0
c  in DIMACS:
 1472  1473  1474  104  1475 0
 1472  1473  1474  104 -1476 0
 1472  1473  1474  104  1477 0

c  -1-1 --> -2
c    ( b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧  b^{1, 104}_0 ∧ -p_104) -> ( b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0)
c  in CNF:
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨  b^{1, 105}_2
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨  b^{1, 105}_1
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨  p_104 ∨ -b^{1, 105}_0
c  in DIMACS:
-1472  1473 -1474  104  1475 0
-1472  1473 -1474  104  1476 0
-1472  1473 -1474  104 -1477 0

c  -2-1 --> break 
c    ( b^{1, 104}_2 ∧  b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨  b^{1, 104}_0 ∨  p_104 ∨ break
c  in DIMACS:
-1472 -1473  1474  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 104}_2 ∧ -b^{1, 104}_1 ∧ -b^{1, 104}_0 ∧ true) 
c  in CNF:
c    -b^{1, 104}_2 ∨  b^{1, 104}_1 ∨  b^{1, 104}_0 ∨ false 
c  in DIMACS:
-1472  1473  1474  0

c  3 does not represent an automaton state.
c    -(-b^{1, 104}_2 ∧  b^{1, 104}_1 ∧  b^{1, 104}_0 ∧ true) 
c  in CNF:
c     b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ false 
c  in DIMACS:
 1472 -1473 -1474  0
c  -3 does not represent an automaton state.
c    -( b^{1, 104}_2 ∧  b^{1, 104}_1 ∧  b^{1, 104}_0 ∧ true) 
c  in CNF:
c    -b^{1, 104}_2 ∨ -b^{1, 104}_1 ∨ -b^{1, 104}_0 ∨ false 
c  in DIMACS:
-1472 -1473 -1474  0

c i = 105
c  -2+1 --> -1
c    ( b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧  p_105) -> ( b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0)
c  in CNF:
c    -b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨  b^{1, 106}_2
c    -b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_1
c    -b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨  b^{1, 106}_0
c  in DIMACS:
-1475 -1476  1477 -105  1478 0
-1475 -1476  1477 -105 -1479 0
-1475 -1476  1477 -105  1480 0

c  -1+1 --> 0
c    ( b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0 ∧  p_105) -> (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧ -b^{1, 106}_0)
c  in CNF:
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_2
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_1
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_0
c  in DIMACS:
-1475  1476 -1477 -105 -1478 0
-1475  1476 -1477 -105 -1479 0
-1475  1476 -1477 -105 -1480 0

c  0+1 --> 1
c    (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧  p_105) -> (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0)
c  in CNF:
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_2
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_1
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨  b^{1, 106}_0
c  in DIMACS:
 1475  1476  1477 -105 -1478 0
 1475  1476  1477 -105 -1479 0
 1475  1476  1477 -105  1480 0

c  1+1 --> 2
c    (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0 ∧  p_105) -> (-b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0)
c  in CNF:
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_2
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨  b^{1, 106}_1
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ -p_105 ∨ -b^{1, 106}_0
c  in DIMACS:
 1475  1476 -1477 -105 -1478 0
 1475  1476 -1477 -105  1479 0
 1475  1476 -1477 -105 -1480 0

c  2+1 --> break 
c    (-b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧  p_105) -> break
c  in CNF:
c     b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 1475 -1476  1477 -105 1162 0


c  2-1 --> 1
c    (-b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧ -p_105) -> (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0)
c  in CNF:
c     b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_2
c     b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_1
c     b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨  b^{1, 106}_0
c  in DIMACS:
 1475 -1476  1477  105 -1478 0
 1475 -1476  1477  105 -1479 0
 1475 -1476  1477  105  1480 0

c  1-1 --> 0
c    (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0 ∧ -p_105) -> (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧ -b^{1, 106}_0)
c  in CNF:
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_2
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_1
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_0
c  in DIMACS:
 1475  1476 -1477  105 -1478 0
 1475  1476 -1477  105 -1479 0
 1475  1476 -1477  105 -1480 0

c  0-1 --> -1
c    (-b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧ -p_105) -> ( b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0)
c  in CNF:
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨  b^{1, 106}_2
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_1
c     b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨  b^{1, 106}_0
c  in DIMACS:
 1475  1476  1477  105  1478 0
 1475  1476  1477  105 -1479 0
 1475  1476  1477  105  1480 0

c  -1-1 --> -2
c    ( b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧  b^{1, 105}_0 ∧ -p_105) -> ( b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0)
c  in CNF:
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨  b^{1, 106}_2
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨  b^{1, 106}_1
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨  p_105 ∨ -b^{1, 106}_0
c  in DIMACS:
-1475  1476 -1477  105  1478 0
-1475  1476 -1477  105  1479 0
-1475  1476 -1477  105 -1480 0

c  -2-1 --> break 
c    ( b^{1, 105}_2 ∧  b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨  b^{1, 105}_0 ∨  p_105 ∨ break
c  in DIMACS:
-1475 -1476  1477  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 105}_2 ∧ -b^{1, 105}_1 ∧ -b^{1, 105}_0 ∧ true) 
c  in CNF:
c    -b^{1, 105}_2 ∨  b^{1, 105}_1 ∨  b^{1, 105}_0 ∨ false 
c  in DIMACS:
-1475  1476  1477  0

c  3 does not represent an automaton state.
c    -(-b^{1, 105}_2 ∧  b^{1, 105}_1 ∧  b^{1, 105}_0 ∧ true) 
c  in CNF:
c     b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ false 
c  in DIMACS:
 1475 -1476 -1477  0
c  -3 does not represent an automaton state.
c    -( b^{1, 105}_2 ∧  b^{1, 105}_1 ∧  b^{1, 105}_0 ∧ true) 
c  in CNF:
c    -b^{1, 105}_2 ∨ -b^{1, 105}_1 ∨ -b^{1, 105}_0 ∨ false 
c  in DIMACS:
-1475 -1476 -1477  0

c i = 106
c  -2+1 --> -1
c    ( b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧  p_106) -> ( b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0)
c  in CNF:
c    -b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨  b^{1, 107}_2
c    -b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_1
c    -b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨  b^{1, 107}_0
c  in DIMACS:
-1478 -1479  1480 -106  1481 0
-1478 -1479  1480 -106 -1482 0
-1478 -1479  1480 -106  1483 0

c  -1+1 --> 0
c    ( b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0 ∧  p_106) -> (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧ -b^{1, 107}_0)
c  in CNF:
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_2
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_1
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_0
c  in DIMACS:
-1478  1479 -1480 -106 -1481 0
-1478  1479 -1480 -106 -1482 0
-1478  1479 -1480 -106 -1483 0

c  0+1 --> 1
c    (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧  p_106) -> (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0)
c  in CNF:
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_2
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_1
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨  b^{1, 107}_0
c  in DIMACS:
 1478  1479  1480 -106 -1481 0
 1478  1479  1480 -106 -1482 0
 1478  1479  1480 -106  1483 0

c  1+1 --> 2
c    (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0 ∧  p_106) -> (-b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0)
c  in CNF:
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_2
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨  b^{1, 107}_1
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ -p_106 ∨ -b^{1, 107}_0
c  in DIMACS:
 1478  1479 -1480 -106 -1481 0
 1478  1479 -1480 -106  1482 0
 1478  1479 -1480 -106 -1483 0

c  2+1 --> break 
c    (-b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧  p_106) -> break
c  in CNF:
c     b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ -p_106 ∨ break
c  in DIMACS:
 1478 -1479  1480 -106 1162 0


c  2-1 --> 1
c    (-b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧ -p_106) -> (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0)
c  in CNF:
c     b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_2
c     b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_1
c     b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨  b^{1, 107}_0
c  in DIMACS:
 1478 -1479  1480  106 -1481 0
 1478 -1479  1480  106 -1482 0
 1478 -1479  1480  106  1483 0

c  1-1 --> 0
c    (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0 ∧ -p_106) -> (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧ -b^{1, 107}_0)
c  in CNF:
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_2
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_1
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_0
c  in DIMACS:
 1478  1479 -1480  106 -1481 0
 1478  1479 -1480  106 -1482 0
 1478  1479 -1480  106 -1483 0

c  0-1 --> -1
c    (-b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧ -p_106) -> ( b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0)
c  in CNF:
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨  b^{1, 107}_2
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_1
c     b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨  b^{1, 107}_0
c  in DIMACS:
 1478  1479  1480  106  1481 0
 1478  1479  1480  106 -1482 0
 1478  1479  1480  106  1483 0

c  -1-1 --> -2
c    ( b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧  b^{1, 106}_0 ∧ -p_106) -> ( b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0)
c  in CNF:
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨  b^{1, 107}_2
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨  b^{1, 107}_1
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨  p_106 ∨ -b^{1, 107}_0
c  in DIMACS:
-1478  1479 -1480  106  1481 0
-1478  1479 -1480  106  1482 0
-1478  1479 -1480  106 -1483 0

c  -2-1 --> break 
c    ( b^{1, 106}_2 ∧  b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧ -p_106) -> break
c  in CNF:
c    -b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨  b^{1, 106}_0 ∨  p_106 ∨ break
c  in DIMACS:
-1478 -1479  1480  106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 106}_2 ∧ -b^{1, 106}_1 ∧ -b^{1, 106}_0 ∧ true) 
c  in CNF:
c    -b^{1, 106}_2 ∨  b^{1, 106}_1 ∨  b^{1, 106}_0 ∨ false 
c  in DIMACS:
-1478  1479  1480  0

c  3 does not represent an automaton state.
c    -(-b^{1, 106}_2 ∧  b^{1, 106}_1 ∧  b^{1, 106}_0 ∧ true) 
c  in CNF:
c     b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ false 
c  in DIMACS:
 1478 -1479 -1480  0
c  -3 does not represent an automaton state.
c    -( b^{1, 106}_2 ∧  b^{1, 106}_1 ∧  b^{1, 106}_0 ∧ true) 
c  in CNF:
c    -b^{1, 106}_2 ∨ -b^{1, 106}_1 ∨ -b^{1, 106}_0 ∨ false 
c  in DIMACS:
-1478 -1479 -1480  0

c i = 107
c  -2+1 --> -1
c    ( b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧  p_107) -> ( b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0)
c  in CNF:
c    -b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨  b^{1, 108}_2
c    -b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_1
c    -b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨  b^{1, 108}_0
c  in DIMACS:
-1481 -1482  1483 -107  1484 0
-1481 -1482  1483 -107 -1485 0
-1481 -1482  1483 -107  1486 0

c  -1+1 --> 0
c    ( b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0 ∧  p_107) -> (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧ -b^{1, 108}_0)
c  in CNF:
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_2
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_1
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_0
c  in DIMACS:
-1481  1482 -1483 -107 -1484 0
-1481  1482 -1483 -107 -1485 0
-1481  1482 -1483 -107 -1486 0

c  0+1 --> 1
c    (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧  p_107) -> (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0)
c  in CNF:
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_2
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_1
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨  b^{1, 108}_0
c  in DIMACS:
 1481  1482  1483 -107 -1484 0
 1481  1482  1483 -107 -1485 0
 1481  1482  1483 -107  1486 0

c  1+1 --> 2
c    (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0 ∧  p_107) -> (-b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0)
c  in CNF:
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_2
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨  b^{1, 108}_1
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ -p_107 ∨ -b^{1, 108}_0
c  in DIMACS:
 1481  1482 -1483 -107 -1484 0
 1481  1482 -1483 -107  1485 0
 1481  1482 -1483 -107 -1486 0

c  2+1 --> break 
c    (-b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧  p_107) -> break
c  in CNF:
c     b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ -p_107 ∨ break
c  in DIMACS:
 1481 -1482  1483 -107 1162 0


c  2-1 --> 1
c    (-b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧ -p_107) -> (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0)
c  in CNF:
c     b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_2
c     b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_1
c     b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨  b^{1, 108}_0
c  in DIMACS:
 1481 -1482  1483  107 -1484 0
 1481 -1482  1483  107 -1485 0
 1481 -1482  1483  107  1486 0

c  1-1 --> 0
c    (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0 ∧ -p_107) -> (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧ -b^{1, 108}_0)
c  in CNF:
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_2
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_1
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_0
c  in DIMACS:
 1481  1482 -1483  107 -1484 0
 1481  1482 -1483  107 -1485 0
 1481  1482 -1483  107 -1486 0

c  0-1 --> -1
c    (-b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧ -p_107) -> ( b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0)
c  in CNF:
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨  b^{1, 108}_2
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_1
c     b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨  b^{1, 108}_0
c  in DIMACS:
 1481  1482  1483  107  1484 0
 1481  1482  1483  107 -1485 0
 1481  1482  1483  107  1486 0

c  -1-1 --> -2
c    ( b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧  b^{1, 107}_0 ∧ -p_107) -> ( b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0)
c  in CNF:
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨  b^{1, 108}_2
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨  b^{1, 108}_1
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨  p_107 ∨ -b^{1, 108}_0
c  in DIMACS:
-1481  1482 -1483  107  1484 0
-1481  1482 -1483  107  1485 0
-1481  1482 -1483  107 -1486 0

c  -2-1 --> break 
c    ( b^{1, 107}_2 ∧  b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧ -p_107) -> break
c  in CNF:
c    -b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨  b^{1, 107}_0 ∨  p_107 ∨ break
c  in DIMACS:
-1481 -1482  1483  107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 107}_2 ∧ -b^{1, 107}_1 ∧ -b^{1, 107}_0 ∧ true) 
c  in CNF:
c    -b^{1, 107}_2 ∨  b^{1, 107}_1 ∨  b^{1, 107}_0 ∨ false 
c  in DIMACS:
-1481  1482  1483  0

c  3 does not represent an automaton state.
c    -(-b^{1, 107}_2 ∧  b^{1, 107}_1 ∧  b^{1, 107}_0 ∧ true) 
c  in CNF:
c     b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ false 
c  in DIMACS:
 1481 -1482 -1483  0
c  -3 does not represent an automaton state.
c    -( b^{1, 107}_2 ∧  b^{1, 107}_1 ∧  b^{1, 107}_0 ∧ true) 
c  in CNF:
c    -b^{1, 107}_2 ∨ -b^{1, 107}_1 ∨ -b^{1, 107}_0 ∨ false 
c  in DIMACS:
-1481 -1482 -1483  0

c i = 108
c  -2+1 --> -1
c    ( b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧  p_108) -> ( b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0)
c  in CNF:
c    -b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨  b^{1, 109}_2
c    -b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_1
c    -b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨  b^{1, 109}_0
c  in DIMACS:
-1484 -1485  1486 -108  1487 0
-1484 -1485  1486 -108 -1488 0
-1484 -1485  1486 -108  1489 0

c  -1+1 --> 0
c    ( b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0 ∧  p_108) -> (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧ -b^{1, 109}_0)
c  in CNF:
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_2
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_1
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_0
c  in DIMACS:
-1484  1485 -1486 -108 -1487 0
-1484  1485 -1486 -108 -1488 0
-1484  1485 -1486 -108 -1489 0

c  0+1 --> 1
c    (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧  p_108) -> (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0)
c  in CNF:
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_2
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_1
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨  b^{1, 109}_0
c  in DIMACS:
 1484  1485  1486 -108 -1487 0
 1484  1485  1486 -108 -1488 0
 1484  1485  1486 -108  1489 0

c  1+1 --> 2
c    (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0 ∧  p_108) -> (-b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0)
c  in CNF:
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_2
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨  b^{1, 109}_1
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ -p_108 ∨ -b^{1, 109}_0
c  in DIMACS:
 1484  1485 -1486 -108 -1487 0
 1484  1485 -1486 -108  1488 0
 1484  1485 -1486 -108 -1489 0

c  2+1 --> break 
c    (-b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧  p_108) -> break
c  in CNF:
c     b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 1484 -1485  1486 -108 1162 0


c  2-1 --> 1
c    (-b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧ -p_108) -> (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0)
c  in CNF:
c     b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_2
c     b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_1
c     b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨  b^{1, 109}_0
c  in DIMACS:
 1484 -1485  1486  108 -1487 0
 1484 -1485  1486  108 -1488 0
 1484 -1485  1486  108  1489 0

c  1-1 --> 0
c    (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0 ∧ -p_108) -> (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧ -b^{1, 109}_0)
c  in CNF:
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_2
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_1
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_0
c  in DIMACS:
 1484  1485 -1486  108 -1487 0
 1484  1485 -1486  108 -1488 0
 1484  1485 -1486  108 -1489 0

c  0-1 --> -1
c    (-b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧ -p_108) -> ( b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0)
c  in CNF:
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨  b^{1, 109}_2
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_1
c     b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨  b^{1, 109}_0
c  in DIMACS:
 1484  1485  1486  108  1487 0
 1484  1485  1486  108 -1488 0
 1484  1485  1486  108  1489 0

c  -1-1 --> -2
c    ( b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧  b^{1, 108}_0 ∧ -p_108) -> ( b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0)
c  in CNF:
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨  b^{1, 109}_2
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨  b^{1, 109}_1
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨  p_108 ∨ -b^{1, 109}_0
c  in DIMACS:
-1484  1485 -1486  108  1487 0
-1484  1485 -1486  108  1488 0
-1484  1485 -1486  108 -1489 0

c  -2-1 --> break 
c    ( b^{1, 108}_2 ∧  b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨  b^{1, 108}_0 ∨  p_108 ∨ break
c  in DIMACS:
-1484 -1485  1486  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 108}_2 ∧ -b^{1, 108}_1 ∧ -b^{1, 108}_0 ∧ true) 
c  in CNF:
c    -b^{1, 108}_2 ∨  b^{1, 108}_1 ∨  b^{1, 108}_0 ∨ false 
c  in DIMACS:
-1484  1485  1486  0

c  3 does not represent an automaton state.
c    -(-b^{1, 108}_2 ∧  b^{1, 108}_1 ∧  b^{1, 108}_0 ∧ true) 
c  in CNF:
c     b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ false 
c  in DIMACS:
 1484 -1485 -1486  0
c  -3 does not represent an automaton state.
c    -( b^{1, 108}_2 ∧  b^{1, 108}_1 ∧  b^{1, 108}_0 ∧ true) 
c  in CNF:
c    -b^{1, 108}_2 ∨ -b^{1, 108}_1 ∨ -b^{1, 108}_0 ∨ false 
c  in DIMACS:
-1484 -1485 -1486  0

c i = 109
c  -2+1 --> -1
c    ( b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧  p_109) -> ( b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0)
c  in CNF:
c    -b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨  b^{1, 110}_2
c    -b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_1
c    -b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨  b^{1, 110}_0
c  in DIMACS:
-1487 -1488  1489 -109  1490 0
-1487 -1488  1489 -109 -1491 0
-1487 -1488  1489 -109  1492 0

c  -1+1 --> 0
c    ( b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0 ∧  p_109) -> (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧ -b^{1, 110}_0)
c  in CNF:
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_2
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_1
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_0
c  in DIMACS:
-1487  1488 -1489 -109 -1490 0
-1487  1488 -1489 -109 -1491 0
-1487  1488 -1489 -109 -1492 0

c  0+1 --> 1
c    (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧  p_109) -> (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0)
c  in CNF:
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_2
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_1
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨  b^{1, 110}_0
c  in DIMACS:
 1487  1488  1489 -109 -1490 0
 1487  1488  1489 -109 -1491 0
 1487  1488  1489 -109  1492 0

c  1+1 --> 2
c    (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0 ∧  p_109) -> (-b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0)
c  in CNF:
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_2
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨  b^{1, 110}_1
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ -p_109 ∨ -b^{1, 110}_0
c  in DIMACS:
 1487  1488 -1489 -109 -1490 0
 1487  1488 -1489 -109  1491 0
 1487  1488 -1489 -109 -1492 0

c  2+1 --> break 
c    (-b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧  p_109) -> break
c  in CNF:
c     b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ -p_109 ∨ break
c  in DIMACS:
 1487 -1488  1489 -109 1162 0


c  2-1 --> 1
c    (-b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧ -p_109) -> (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0)
c  in CNF:
c     b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_2
c     b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_1
c     b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨  b^{1, 110}_0
c  in DIMACS:
 1487 -1488  1489  109 -1490 0
 1487 -1488  1489  109 -1491 0
 1487 -1488  1489  109  1492 0

c  1-1 --> 0
c    (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0 ∧ -p_109) -> (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧ -b^{1, 110}_0)
c  in CNF:
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_2
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_1
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_0
c  in DIMACS:
 1487  1488 -1489  109 -1490 0
 1487  1488 -1489  109 -1491 0
 1487  1488 -1489  109 -1492 0

c  0-1 --> -1
c    (-b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧ -p_109) -> ( b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0)
c  in CNF:
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨  b^{1, 110}_2
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_1
c     b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨  b^{1, 110}_0
c  in DIMACS:
 1487  1488  1489  109  1490 0
 1487  1488  1489  109 -1491 0
 1487  1488  1489  109  1492 0

c  -1-1 --> -2
c    ( b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧  b^{1, 109}_0 ∧ -p_109) -> ( b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0)
c  in CNF:
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨  b^{1, 110}_2
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨  b^{1, 110}_1
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨  p_109 ∨ -b^{1, 110}_0
c  in DIMACS:
-1487  1488 -1489  109  1490 0
-1487  1488 -1489  109  1491 0
-1487  1488 -1489  109 -1492 0

c  -2-1 --> break 
c    ( b^{1, 109}_2 ∧  b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧ -p_109) -> break
c  in CNF:
c    -b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨  b^{1, 109}_0 ∨  p_109 ∨ break
c  in DIMACS:
-1487 -1488  1489  109 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 109}_2 ∧ -b^{1, 109}_1 ∧ -b^{1, 109}_0 ∧ true) 
c  in CNF:
c    -b^{1, 109}_2 ∨  b^{1, 109}_1 ∨  b^{1, 109}_0 ∨ false 
c  in DIMACS:
-1487  1488  1489  0

c  3 does not represent an automaton state.
c    -(-b^{1, 109}_2 ∧  b^{1, 109}_1 ∧  b^{1, 109}_0 ∧ true) 
c  in CNF:
c     b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ false 
c  in DIMACS:
 1487 -1488 -1489  0
c  -3 does not represent an automaton state.
c    -( b^{1, 109}_2 ∧  b^{1, 109}_1 ∧  b^{1, 109}_0 ∧ true) 
c  in CNF:
c    -b^{1, 109}_2 ∨ -b^{1, 109}_1 ∨ -b^{1, 109}_0 ∨ false 
c  in DIMACS:
-1487 -1488 -1489  0

c i = 110
c  -2+1 --> -1
c    ( b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧  p_110) -> ( b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0)
c  in CNF:
c    -b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨  b^{1, 111}_2
c    -b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_1
c    -b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨  b^{1, 111}_0
c  in DIMACS:
-1490 -1491  1492 -110  1493 0
-1490 -1491  1492 -110 -1494 0
-1490 -1491  1492 -110  1495 0

c  -1+1 --> 0
c    ( b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0 ∧  p_110) -> (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧ -b^{1, 111}_0)
c  in CNF:
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_2
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_1
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_0
c  in DIMACS:
-1490  1491 -1492 -110 -1493 0
-1490  1491 -1492 -110 -1494 0
-1490  1491 -1492 -110 -1495 0

c  0+1 --> 1
c    (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧  p_110) -> (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0)
c  in CNF:
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_2
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_1
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨  b^{1, 111}_0
c  in DIMACS:
 1490  1491  1492 -110 -1493 0
 1490  1491  1492 -110 -1494 0
 1490  1491  1492 -110  1495 0

c  1+1 --> 2
c    (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0 ∧  p_110) -> (-b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0)
c  in CNF:
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_2
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨  b^{1, 111}_1
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ -p_110 ∨ -b^{1, 111}_0
c  in DIMACS:
 1490  1491 -1492 -110 -1493 0
 1490  1491 -1492 -110  1494 0
 1490  1491 -1492 -110 -1495 0

c  2+1 --> break 
c    (-b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧  p_110) -> break
c  in CNF:
c     b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 1490 -1491  1492 -110 1162 0


c  2-1 --> 1
c    (-b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧ -p_110) -> (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0)
c  in CNF:
c     b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_2
c     b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_1
c     b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨  b^{1, 111}_0
c  in DIMACS:
 1490 -1491  1492  110 -1493 0
 1490 -1491  1492  110 -1494 0
 1490 -1491  1492  110  1495 0

c  1-1 --> 0
c    (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0 ∧ -p_110) -> (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧ -b^{1, 111}_0)
c  in CNF:
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_2
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_1
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_0
c  in DIMACS:
 1490  1491 -1492  110 -1493 0
 1490  1491 -1492  110 -1494 0
 1490  1491 -1492  110 -1495 0

c  0-1 --> -1
c    (-b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧ -p_110) -> ( b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0)
c  in CNF:
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨  b^{1, 111}_2
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_1
c     b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨  b^{1, 111}_0
c  in DIMACS:
 1490  1491  1492  110  1493 0
 1490  1491  1492  110 -1494 0
 1490  1491  1492  110  1495 0

c  -1-1 --> -2
c    ( b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧  b^{1, 110}_0 ∧ -p_110) -> ( b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0)
c  in CNF:
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨  b^{1, 111}_2
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨  b^{1, 111}_1
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨  p_110 ∨ -b^{1, 111}_0
c  in DIMACS:
-1490  1491 -1492  110  1493 0
-1490  1491 -1492  110  1494 0
-1490  1491 -1492  110 -1495 0

c  -2-1 --> break 
c    ( b^{1, 110}_2 ∧  b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨  b^{1, 110}_0 ∨  p_110 ∨ break
c  in DIMACS:
-1490 -1491  1492  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 110}_2 ∧ -b^{1, 110}_1 ∧ -b^{1, 110}_0 ∧ true) 
c  in CNF:
c    -b^{1, 110}_2 ∨  b^{1, 110}_1 ∨  b^{1, 110}_0 ∨ false 
c  in DIMACS:
-1490  1491  1492  0

c  3 does not represent an automaton state.
c    -(-b^{1, 110}_2 ∧  b^{1, 110}_1 ∧  b^{1, 110}_0 ∧ true) 
c  in CNF:
c     b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ false 
c  in DIMACS:
 1490 -1491 -1492  0
c  -3 does not represent an automaton state.
c    -( b^{1, 110}_2 ∧  b^{1, 110}_1 ∧  b^{1, 110}_0 ∧ true) 
c  in CNF:
c    -b^{1, 110}_2 ∨ -b^{1, 110}_1 ∨ -b^{1, 110}_0 ∨ false 
c  in DIMACS:
-1490 -1491 -1492  0

c i = 111
c  -2+1 --> -1
c    ( b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧  p_111) -> ( b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0)
c  in CNF:
c    -b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨  b^{1, 112}_2
c    -b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_1
c    -b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨  b^{1, 112}_0
c  in DIMACS:
-1493 -1494  1495 -111  1496 0
-1493 -1494  1495 -111 -1497 0
-1493 -1494  1495 -111  1498 0

c  -1+1 --> 0
c    ( b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0 ∧  p_111) -> (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧ -b^{1, 112}_0)
c  in CNF:
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_2
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_1
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_0
c  in DIMACS:
-1493  1494 -1495 -111 -1496 0
-1493  1494 -1495 -111 -1497 0
-1493  1494 -1495 -111 -1498 0

c  0+1 --> 1
c    (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧  p_111) -> (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0)
c  in CNF:
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_2
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_1
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨  b^{1, 112}_0
c  in DIMACS:
 1493  1494  1495 -111 -1496 0
 1493  1494  1495 -111 -1497 0
 1493  1494  1495 -111  1498 0

c  1+1 --> 2
c    (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0 ∧  p_111) -> (-b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0)
c  in CNF:
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_2
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨  b^{1, 112}_1
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ -p_111 ∨ -b^{1, 112}_0
c  in DIMACS:
 1493  1494 -1495 -111 -1496 0
 1493  1494 -1495 -111  1497 0
 1493  1494 -1495 -111 -1498 0

c  2+1 --> break 
c    (-b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧  p_111) -> break
c  in CNF:
c     b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ -p_111 ∨ break
c  in DIMACS:
 1493 -1494  1495 -111 1162 0


c  2-1 --> 1
c    (-b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧ -p_111) -> (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0)
c  in CNF:
c     b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_2
c     b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_1
c     b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨  b^{1, 112}_0
c  in DIMACS:
 1493 -1494  1495  111 -1496 0
 1493 -1494  1495  111 -1497 0
 1493 -1494  1495  111  1498 0

c  1-1 --> 0
c    (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0 ∧ -p_111) -> (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧ -b^{1, 112}_0)
c  in CNF:
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_2
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_1
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_0
c  in DIMACS:
 1493  1494 -1495  111 -1496 0
 1493  1494 -1495  111 -1497 0
 1493  1494 -1495  111 -1498 0

c  0-1 --> -1
c    (-b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧ -p_111) -> ( b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0)
c  in CNF:
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨  b^{1, 112}_2
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_1
c     b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨  b^{1, 112}_0
c  in DIMACS:
 1493  1494  1495  111  1496 0
 1493  1494  1495  111 -1497 0
 1493  1494  1495  111  1498 0

c  -1-1 --> -2
c    ( b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧  b^{1, 111}_0 ∧ -p_111) -> ( b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0)
c  in CNF:
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨  b^{1, 112}_2
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨  b^{1, 112}_1
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨  p_111 ∨ -b^{1, 112}_0
c  in DIMACS:
-1493  1494 -1495  111  1496 0
-1493  1494 -1495  111  1497 0
-1493  1494 -1495  111 -1498 0

c  -2-1 --> break 
c    ( b^{1, 111}_2 ∧  b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧ -p_111) -> break
c  in CNF:
c    -b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨  b^{1, 111}_0 ∨  p_111 ∨ break
c  in DIMACS:
-1493 -1494  1495  111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 111}_2 ∧ -b^{1, 111}_1 ∧ -b^{1, 111}_0 ∧ true) 
c  in CNF:
c    -b^{1, 111}_2 ∨  b^{1, 111}_1 ∨  b^{1, 111}_0 ∨ false 
c  in DIMACS:
-1493  1494  1495  0

c  3 does not represent an automaton state.
c    -(-b^{1, 111}_2 ∧  b^{1, 111}_1 ∧  b^{1, 111}_0 ∧ true) 
c  in CNF:
c     b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ false 
c  in DIMACS:
 1493 -1494 -1495  0
c  -3 does not represent an automaton state.
c    -( b^{1, 111}_2 ∧  b^{1, 111}_1 ∧  b^{1, 111}_0 ∧ true) 
c  in CNF:
c    -b^{1, 111}_2 ∨ -b^{1, 111}_1 ∨ -b^{1, 111}_0 ∨ false 
c  in DIMACS:
-1493 -1494 -1495  0

c i = 112
c  -2+1 --> -1
c    ( b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧  p_112) -> ( b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0)
c  in CNF:
c    -b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨  b^{1, 113}_2
c    -b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_1
c    -b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨  b^{1, 113}_0
c  in DIMACS:
-1496 -1497  1498 -112  1499 0
-1496 -1497  1498 -112 -1500 0
-1496 -1497  1498 -112  1501 0

c  -1+1 --> 0
c    ( b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0 ∧  p_112) -> (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧ -b^{1, 113}_0)
c  in CNF:
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_2
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_1
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_0
c  in DIMACS:
-1496  1497 -1498 -112 -1499 0
-1496  1497 -1498 -112 -1500 0
-1496  1497 -1498 -112 -1501 0

c  0+1 --> 1
c    (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧  p_112) -> (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0)
c  in CNF:
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_2
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_1
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨  b^{1, 113}_0
c  in DIMACS:
 1496  1497  1498 -112 -1499 0
 1496  1497  1498 -112 -1500 0
 1496  1497  1498 -112  1501 0

c  1+1 --> 2
c    (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0 ∧  p_112) -> (-b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0)
c  in CNF:
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_2
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨  b^{1, 113}_1
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ -p_112 ∨ -b^{1, 113}_0
c  in DIMACS:
 1496  1497 -1498 -112 -1499 0
 1496  1497 -1498 -112  1500 0
 1496  1497 -1498 -112 -1501 0

c  2+1 --> break 
c    (-b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧  p_112) -> break
c  in CNF:
c     b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 1496 -1497  1498 -112 1162 0


c  2-1 --> 1
c    (-b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧ -p_112) -> (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0)
c  in CNF:
c     b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_2
c     b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_1
c     b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨  b^{1, 113}_0
c  in DIMACS:
 1496 -1497  1498  112 -1499 0
 1496 -1497  1498  112 -1500 0
 1496 -1497  1498  112  1501 0

c  1-1 --> 0
c    (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0 ∧ -p_112) -> (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧ -b^{1, 113}_0)
c  in CNF:
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_2
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_1
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_0
c  in DIMACS:
 1496  1497 -1498  112 -1499 0
 1496  1497 -1498  112 -1500 0
 1496  1497 -1498  112 -1501 0

c  0-1 --> -1
c    (-b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧ -p_112) -> ( b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0)
c  in CNF:
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨  b^{1, 113}_2
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_1
c     b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨  b^{1, 113}_0
c  in DIMACS:
 1496  1497  1498  112  1499 0
 1496  1497  1498  112 -1500 0
 1496  1497  1498  112  1501 0

c  -1-1 --> -2
c    ( b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧  b^{1, 112}_0 ∧ -p_112) -> ( b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0)
c  in CNF:
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨  b^{1, 113}_2
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨  b^{1, 113}_1
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨  p_112 ∨ -b^{1, 113}_0
c  in DIMACS:
-1496  1497 -1498  112  1499 0
-1496  1497 -1498  112  1500 0
-1496  1497 -1498  112 -1501 0

c  -2-1 --> break 
c    ( b^{1, 112}_2 ∧  b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨  b^{1, 112}_0 ∨  p_112 ∨ break
c  in DIMACS:
-1496 -1497  1498  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 112}_2 ∧ -b^{1, 112}_1 ∧ -b^{1, 112}_0 ∧ true) 
c  in CNF:
c    -b^{1, 112}_2 ∨  b^{1, 112}_1 ∨  b^{1, 112}_0 ∨ false 
c  in DIMACS:
-1496  1497  1498  0

c  3 does not represent an automaton state.
c    -(-b^{1, 112}_2 ∧  b^{1, 112}_1 ∧  b^{1, 112}_0 ∧ true) 
c  in CNF:
c     b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ false 
c  in DIMACS:
 1496 -1497 -1498  0
c  -3 does not represent an automaton state.
c    -( b^{1, 112}_2 ∧  b^{1, 112}_1 ∧  b^{1, 112}_0 ∧ true) 
c  in CNF:
c    -b^{1, 112}_2 ∨ -b^{1, 112}_1 ∨ -b^{1, 112}_0 ∨ false 
c  in DIMACS:
-1496 -1497 -1498  0

c i = 113
c  -2+1 --> -1
c    ( b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧  p_113) -> ( b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0)
c  in CNF:
c    -b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨  b^{1, 114}_2
c    -b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_1
c    -b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨  b^{1, 114}_0
c  in DIMACS:
-1499 -1500  1501 -113  1502 0
-1499 -1500  1501 -113 -1503 0
-1499 -1500  1501 -113  1504 0

c  -1+1 --> 0
c    ( b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0 ∧  p_113) -> (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧ -b^{1, 114}_0)
c  in CNF:
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_2
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_1
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_0
c  in DIMACS:
-1499  1500 -1501 -113 -1502 0
-1499  1500 -1501 -113 -1503 0
-1499  1500 -1501 -113 -1504 0

c  0+1 --> 1
c    (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧  p_113) -> (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0)
c  in CNF:
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_2
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_1
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨  b^{1, 114}_0
c  in DIMACS:
 1499  1500  1501 -113 -1502 0
 1499  1500  1501 -113 -1503 0
 1499  1500  1501 -113  1504 0

c  1+1 --> 2
c    (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0 ∧  p_113) -> (-b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0)
c  in CNF:
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_2
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨  b^{1, 114}_1
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ -p_113 ∨ -b^{1, 114}_0
c  in DIMACS:
 1499  1500 -1501 -113 -1502 0
 1499  1500 -1501 -113  1503 0
 1499  1500 -1501 -113 -1504 0

c  2+1 --> break 
c    (-b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧  p_113) -> break
c  in CNF:
c     b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ -p_113 ∨ break
c  in DIMACS:
 1499 -1500  1501 -113 1162 0


c  2-1 --> 1
c    (-b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧ -p_113) -> (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0)
c  in CNF:
c     b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_2
c     b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_1
c     b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨  b^{1, 114}_0
c  in DIMACS:
 1499 -1500  1501  113 -1502 0
 1499 -1500  1501  113 -1503 0
 1499 -1500  1501  113  1504 0

c  1-1 --> 0
c    (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0 ∧ -p_113) -> (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧ -b^{1, 114}_0)
c  in CNF:
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_2
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_1
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_0
c  in DIMACS:
 1499  1500 -1501  113 -1502 0
 1499  1500 -1501  113 -1503 0
 1499  1500 -1501  113 -1504 0

c  0-1 --> -1
c    (-b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧ -p_113) -> ( b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0)
c  in CNF:
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨  b^{1, 114}_2
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_1
c     b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨  b^{1, 114}_0
c  in DIMACS:
 1499  1500  1501  113  1502 0
 1499  1500  1501  113 -1503 0
 1499  1500  1501  113  1504 0

c  -1-1 --> -2
c    ( b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧  b^{1, 113}_0 ∧ -p_113) -> ( b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0)
c  in CNF:
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨  b^{1, 114}_2
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨  b^{1, 114}_1
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨  p_113 ∨ -b^{1, 114}_0
c  in DIMACS:
-1499  1500 -1501  113  1502 0
-1499  1500 -1501  113  1503 0
-1499  1500 -1501  113 -1504 0

c  -2-1 --> break 
c    ( b^{1, 113}_2 ∧  b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧ -p_113) -> break
c  in CNF:
c    -b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨  b^{1, 113}_0 ∨  p_113 ∨ break
c  in DIMACS:
-1499 -1500  1501  113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 113}_2 ∧ -b^{1, 113}_1 ∧ -b^{1, 113}_0 ∧ true) 
c  in CNF:
c    -b^{1, 113}_2 ∨  b^{1, 113}_1 ∨  b^{1, 113}_0 ∨ false 
c  in DIMACS:
-1499  1500  1501  0

c  3 does not represent an automaton state.
c    -(-b^{1, 113}_2 ∧  b^{1, 113}_1 ∧  b^{1, 113}_0 ∧ true) 
c  in CNF:
c     b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ false 
c  in DIMACS:
 1499 -1500 -1501  0
c  -3 does not represent an automaton state.
c    -( b^{1, 113}_2 ∧  b^{1, 113}_1 ∧  b^{1, 113}_0 ∧ true) 
c  in CNF:
c    -b^{1, 113}_2 ∨ -b^{1, 113}_1 ∨ -b^{1, 113}_0 ∨ false 
c  in DIMACS:
-1499 -1500 -1501  0

c i = 114
c  -2+1 --> -1
c    ( b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧  p_114) -> ( b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0)
c  in CNF:
c    -b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨  b^{1, 115}_2
c    -b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_1
c    -b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨  b^{1, 115}_0
c  in DIMACS:
-1502 -1503  1504 -114  1505 0
-1502 -1503  1504 -114 -1506 0
-1502 -1503  1504 -114  1507 0

c  -1+1 --> 0
c    ( b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0 ∧  p_114) -> (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧ -b^{1, 115}_0)
c  in CNF:
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_2
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_1
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_0
c  in DIMACS:
-1502  1503 -1504 -114 -1505 0
-1502  1503 -1504 -114 -1506 0
-1502  1503 -1504 -114 -1507 0

c  0+1 --> 1
c    (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧  p_114) -> (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0)
c  in CNF:
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_2
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_1
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨  b^{1, 115}_0
c  in DIMACS:
 1502  1503  1504 -114 -1505 0
 1502  1503  1504 -114 -1506 0
 1502  1503  1504 -114  1507 0

c  1+1 --> 2
c    (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0 ∧  p_114) -> (-b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0)
c  in CNF:
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_2
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨  b^{1, 115}_1
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ -p_114 ∨ -b^{1, 115}_0
c  in DIMACS:
 1502  1503 -1504 -114 -1505 0
 1502  1503 -1504 -114  1506 0
 1502  1503 -1504 -114 -1507 0

c  2+1 --> break 
c    (-b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧  p_114) -> break
c  in CNF:
c     b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 1502 -1503  1504 -114 1162 0


c  2-1 --> 1
c    (-b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧ -p_114) -> (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0)
c  in CNF:
c     b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_2
c     b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_1
c     b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨  b^{1, 115}_0
c  in DIMACS:
 1502 -1503  1504  114 -1505 0
 1502 -1503  1504  114 -1506 0
 1502 -1503  1504  114  1507 0

c  1-1 --> 0
c    (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0 ∧ -p_114) -> (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧ -b^{1, 115}_0)
c  in CNF:
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_2
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_1
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_0
c  in DIMACS:
 1502  1503 -1504  114 -1505 0
 1502  1503 -1504  114 -1506 0
 1502  1503 -1504  114 -1507 0

c  0-1 --> -1
c    (-b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧ -p_114) -> ( b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0)
c  in CNF:
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨  b^{1, 115}_2
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_1
c     b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨  b^{1, 115}_0
c  in DIMACS:
 1502  1503  1504  114  1505 0
 1502  1503  1504  114 -1506 0
 1502  1503  1504  114  1507 0

c  -1-1 --> -2
c    ( b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧  b^{1, 114}_0 ∧ -p_114) -> ( b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0)
c  in CNF:
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨  b^{1, 115}_2
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨  b^{1, 115}_1
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨  p_114 ∨ -b^{1, 115}_0
c  in DIMACS:
-1502  1503 -1504  114  1505 0
-1502  1503 -1504  114  1506 0
-1502  1503 -1504  114 -1507 0

c  -2-1 --> break 
c    ( b^{1, 114}_2 ∧  b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨  b^{1, 114}_0 ∨  p_114 ∨ break
c  in DIMACS:
-1502 -1503  1504  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 114}_2 ∧ -b^{1, 114}_1 ∧ -b^{1, 114}_0 ∧ true) 
c  in CNF:
c    -b^{1, 114}_2 ∨  b^{1, 114}_1 ∨  b^{1, 114}_0 ∨ false 
c  in DIMACS:
-1502  1503  1504  0

c  3 does not represent an automaton state.
c    -(-b^{1, 114}_2 ∧  b^{1, 114}_1 ∧  b^{1, 114}_0 ∧ true) 
c  in CNF:
c     b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ false 
c  in DIMACS:
 1502 -1503 -1504  0
c  -3 does not represent an automaton state.
c    -( b^{1, 114}_2 ∧  b^{1, 114}_1 ∧  b^{1, 114}_0 ∧ true) 
c  in CNF:
c    -b^{1, 114}_2 ∨ -b^{1, 114}_1 ∨ -b^{1, 114}_0 ∨ false 
c  in DIMACS:
-1502 -1503 -1504  0

c i = 115
c  -2+1 --> -1
c    ( b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧  p_115) -> ( b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0)
c  in CNF:
c    -b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨  b^{1, 116}_2
c    -b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_1
c    -b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨  b^{1, 116}_0
c  in DIMACS:
-1505 -1506  1507 -115  1508 0
-1505 -1506  1507 -115 -1509 0
-1505 -1506  1507 -115  1510 0

c  -1+1 --> 0
c    ( b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0 ∧  p_115) -> (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧ -b^{1, 116}_0)
c  in CNF:
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_2
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_1
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_0
c  in DIMACS:
-1505  1506 -1507 -115 -1508 0
-1505  1506 -1507 -115 -1509 0
-1505  1506 -1507 -115 -1510 0

c  0+1 --> 1
c    (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧  p_115) -> (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0)
c  in CNF:
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_2
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_1
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨  b^{1, 116}_0
c  in DIMACS:
 1505  1506  1507 -115 -1508 0
 1505  1506  1507 -115 -1509 0
 1505  1506  1507 -115  1510 0

c  1+1 --> 2
c    (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0 ∧  p_115) -> (-b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0)
c  in CNF:
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_2
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨  b^{1, 116}_1
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ -p_115 ∨ -b^{1, 116}_0
c  in DIMACS:
 1505  1506 -1507 -115 -1508 0
 1505  1506 -1507 -115  1509 0
 1505  1506 -1507 -115 -1510 0

c  2+1 --> break 
c    (-b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧  p_115) -> break
c  in CNF:
c     b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ -p_115 ∨ break
c  in DIMACS:
 1505 -1506  1507 -115 1162 0


c  2-1 --> 1
c    (-b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧ -p_115) -> (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0)
c  in CNF:
c     b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_2
c     b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_1
c     b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨  b^{1, 116}_0
c  in DIMACS:
 1505 -1506  1507  115 -1508 0
 1505 -1506  1507  115 -1509 0
 1505 -1506  1507  115  1510 0

c  1-1 --> 0
c    (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0 ∧ -p_115) -> (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧ -b^{1, 116}_0)
c  in CNF:
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_2
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_1
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_0
c  in DIMACS:
 1505  1506 -1507  115 -1508 0
 1505  1506 -1507  115 -1509 0
 1505  1506 -1507  115 -1510 0

c  0-1 --> -1
c    (-b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧ -p_115) -> ( b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0)
c  in CNF:
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨  b^{1, 116}_2
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_1
c     b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨  b^{1, 116}_0
c  in DIMACS:
 1505  1506  1507  115  1508 0
 1505  1506  1507  115 -1509 0
 1505  1506  1507  115  1510 0

c  -1-1 --> -2
c    ( b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧  b^{1, 115}_0 ∧ -p_115) -> ( b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0)
c  in CNF:
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨  b^{1, 116}_2
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨  b^{1, 116}_1
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨  p_115 ∨ -b^{1, 116}_0
c  in DIMACS:
-1505  1506 -1507  115  1508 0
-1505  1506 -1507  115  1509 0
-1505  1506 -1507  115 -1510 0

c  -2-1 --> break 
c    ( b^{1, 115}_2 ∧  b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧ -p_115) -> break
c  in CNF:
c    -b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨  b^{1, 115}_0 ∨  p_115 ∨ break
c  in DIMACS:
-1505 -1506  1507  115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 115}_2 ∧ -b^{1, 115}_1 ∧ -b^{1, 115}_0 ∧ true) 
c  in CNF:
c    -b^{1, 115}_2 ∨  b^{1, 115}_1 ∨  b^{1, 115}_0 ∨ false 
c  in DIMACS:
-1505  1506  1507  0

c  3 does not represent an automaton state.
c    -(-b^{1, 115}_2 ∧  b^{1, 115}_1 ∧  b^{1, 115}_0 ∧ true) 
c  in CNF:
c     b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ false 
c  in DIMACS:
 1505 -1506 -1507  0
c  -3 does not represent an automaton state.
c    -( b^{1, 115}_2 ∧  b^{1, 115}_1 ∧  b^{1, 115}_0 ∧ true) 
c  in CNF:
c    -b^{1, 115}_2 ∨ -b^{1, 115}_1 ∨ -b^{1, 115}_0 ∨ false 
c  in DIMACS:
-1505 -1506 -1507  0

c i = 116
c  -2+1 --> -1
c    ( b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧  p_116) -> ( b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0)
c  in CNF:
c    -b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨  b^{1, 117}_2
c    -b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_1
c    -b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨  b^{1, 117}_0
c  in DIMACS:
-1508 -1509  1510 -116  1511 0
-1508 -1509  1510 -116 -1512 0
-1508 -1509  1510 -116  1513 0

c  -1+1 --> 0
c    ( b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0 ∧  p_116) -> (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧ -b^{1, 117}_0)
c  in CNF:
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_2
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_1
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_0
c  in DIMACS:
-1508  1509 -1510 -116 -1511 0
-1508  1509 -1510 -116 -1512 0
-1508  1509 -1510 -116 -1513 0

c  0+1 --> 1
c    (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧  p_116) -> (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0)
c  in CNF:
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_2
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_1
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨  b^{1, 117}_0
c  in DIMACS:
 1508  1509  1510 -116 -1511 0
 1508  1509  1510 -116 -1512 0
 1508  1509  1510 -116  1513 0

c  1+1 --> 2
c    (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0 ∧  p_116) -> (-b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0)
c  in CNF:
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_2
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨  b^{1, 117}_1
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ -p_116 ∨ -b^{1, 117}_0
c  in DIMACS:
 1508  1509 -1510 -116 -1511 0
 1508  1509 -1510 -116  1512 0
 1508  1509 -1510 -116 -1513 0

c  2+1 --> break 
c    (-b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧  p_116) -> break
c  in CNF:
c     b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 1508 -1509  1510 -116 1162 0


c  2-1 --> 1
c    (-b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧ -p_116) -> (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0)
c  in CNF:
c     b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_2
c     b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_1
c     b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨  b^{1, 117}_0
c  in DIMACS:
 1508 -1509  1510  116 -1511 0
 1508 -1509  1510  116 -1512 0
 1508 -1509  1510  116  1513 0

c  1-1 --> 0
c    (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0 ∧ -p_116) -> (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧ -b^{1, 117}_0)
c  in CNF:
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_2
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_1
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_0
c  in DIMACS:
 1508  1509 -1510  116 -1511 0
 1508  1509 -1510  116 -1512 0
 1508  1509 -1510  116 -1513 0

c  0-1 --> -1
c    (-b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧ -p_116) -> ( b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0)
c  in CNF:
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨  b^{1, 117}_2
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_1
c     b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨  b^{1, 117}_0
c  in DIMACS:
 1508  1509  1510  116  1511 0
 1508  1509  1510  116 -1512 0
 1508  1509  1510  116  1513 0

c  -1-1 --> -2
c    ( b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧  b^{1, 116}_0 ∧ -p_116) -> ( b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0)
c  in CNF:
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨  b^{1, 117}_2
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨  b^{1, 117}_1
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨  p_116 ∨ -b^{1, 117}_0
c  in DIMACS:
-1508  1509 -1510  116  1511 0
-1508  1509 -1510  116  1512 0
-1508  1509 -1510  116 -1513 0

c  -2-1 --> break 
c    ( b^{1, 116}_2 ∧  b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨  b^{1, 116}_0 ∨  p_116 ∨ break
c  in DIMACS:
-1508 -1509  1510  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 116}_2 ∧ -b^{1, 116}_1 ∧ -b^{1, 116}_0 ∧ true) 
c  in CNF:
c    -b^{1, 116}_2 ∨  b^{1, 116}_1 ∨  b^{1, 116}_0 ∨ false 
c  in DIMACS:
-1508  1509  1510  0

c  3 does not represent an automaton state.
c    -(-b^{1, 116}_2 ∧  b^{1, 116}_1 ∧  b^{1, 116}_0 ∧ true) 
c  in CNF:
c     b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ false 
c  in DIMACS:
 1508 -1509 -1510  0
c  -3 does not represent an automaton state.
c    -( b^{1, 116}_2 ∧  b^{1, 116}_1 ∧  b^{1, 116}_0 ∧ true) 
c  in CNF:
c    -b^{1, 116}_2 ∨ -b^{1, 116}_1 ∨ -b^{1, 116}_0 ∨ false 
c  in DIMACS:
-1508 -1509 -1510  0

c i = 117
c  -2+1 --> -1
c    ( b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧  p_117) -> ( b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0)
c  in CNF:
c    -b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨  b^{1, 118}_2
c    -b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_1
c    -b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨  b^{1, 118}_0
c  in DIMACS:
-1511 -1512  1513 -117  1514 0
-1511 -1512  1513 -117 -1515 0
-1511 -1512  1513 -117  1516 0

c  -1+1 --> 0
c    ( b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0 ∧  p_117) -> (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧ -b^{1, 118}_0)
c  in CNF:
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_2
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_1
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_0
c  in DIMACS:
-1511  1512 -1513 -117 -1514 0
-1511  1512 -1513 -117 -1515 0
-1511  1512 -1513 -117 -1516 0

c  0+1 --> 1
c    (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧  p_117) -> (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0)
c  in CNF:
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_2
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_1
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨  b^{1, 118}_0
c  in DIMACS:
 1511  1512  1513 -117 -1514 0
 1511  1512  1513 -117 -1515 0
 1511  1512  1513 -117  1516 0

c  1+1 --> 2
c    (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0 ∧  p_117) -> (-b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0)
c  in CNF:
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_2
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨  b^{1, 118}_1
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ -p_117 ∨ -b^{1, 118}_0
c  in DIMACS:
 1511  1512 -1513 -117 -1514 0
 1511  1512 -1513 -117  1515 0
 1511  1512 -1513 -117 -1516 0

c  2+1 --> break 
c    (-b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧  p_117) -> break
c  in CNF:
c     b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 1511 -1512  1513 -117 1162 0


c  2-1 --> 1
c    (-b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧ -p_117) -> (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0)
c  in CNF:
c     b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_2
c     b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_1
c     b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨  b^{1, 118}_0
c  in DIMACS:
 1511 -1512  1513  117 -1514 0
 1511 -1512  1513  117 -1515 0
 1511 -1512  1513  117  1516 0

c  1-1 --> 0
c    (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0 ∧ -p_117) -> (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧ -b^{1, 118}_0)
c  in CNF:
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_2
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_1
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_0
c  in DIMACS:
 1511  1512 -1513  117 -1514 0
 1511  1512 -1513  117 -1515 0
 1511  1512 -1513  117 -1516 0

c  0-1 --> -1
c    (-b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧ -p_117) -> ( b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0)
c  in CNF:
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨  b^{1, 118}_2
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_1
c     b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨  b^{1, 118}_0
c  in DIMACS:
 1511  1512  1513  117  1514 0
 1511  1512  1513  117 -1515 0
 1511  1512  1513  117  1516 0

c  -1-1 --> -2
c    ( b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧  b^{1, 117}_0 ∧ -p_117) -> ( b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0)
c  in CNF:
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨  b^{1, 118}_2
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨  b^{1, 118}_1
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨  p_117 ∨ -b^{1, 118}_0
c  in DIMACS:
-1511  1512 -1513  117  1514 0
-1511  1512 -1513  117  1515 0
-1511  1512 -1513  117 -1516 0

c  -2-1 --> break 
c    ( b^{1, 117}_2 ∧  b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨  b^{1, 117}_0 ∨  p_117 ∨ break
c  in DIMACS:
-1511 -1512  1513  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 117}_2 ∧ -b^{1, 117}_1 ∧ -b^{1, 117}_0 ∧ true) 
c  in CNF:
c    -b^{1, 117}_2 ∨  b^{1, 117}_1 ∨  b^{1, 117}_0 ∨ false 
c  in DIMACS:
-1511  1512  1513  0

c  3 does not represent an automaton state.
c    -(-b^{1, 117}_2 ∧  b^{1, 117}_1 ∧  b^{1, 117}_0 ∧ true) 
c  in CNF:
c     b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ false 
c  in DIMACS:
 1511 -1512 -1513  0
c  -3 does not represent an automaton state.
c    -( b^{1, 117}_2 ∧  b^{1, 117}_1 ∧  b^{1, 117}_0 ∧ true) 
c  in CNF:
c    -b^{1, 117}_2 ∨ -b^{1, 117}_1 ∨ -b^{1, 117}_0 ∨ false 
c  in DIMACS:
-1511 -1512 -1513  0

c i = 118
c  -2+1 --> -1
c    ( b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧  p_118) -> ( b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0)
c  in CNF:
c    -b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨  b^{1, 119}_2
c    -b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_1
c    -b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨  b^{1, 119}_0
c  in DIMACS:
-1514 -1515  1516 -118  1517 0
-1514 -1515  1516 -118 -1518 0
-1514 -1515  1516 -118  1519 0

c  -1+1 --> 0
c    ( b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0 ∧  p_118) -> (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧ -b^{1, 119}_0)
c  in CNF:
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_2
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_1
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_0
c  in DIMACS:
-1514  1515 -1516 -118 -1517 0
-1514  1515 -1516 -118 -1518 0
-1514  1515 -1516 -118 -1519 0

c  0+1 --> 1
c    (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧  p_118) -> (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0)
c  in CNF:
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_2
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_1
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨  b^{1, 119}_0
c  in DIMACS:
 1514  1515  1516 -118 -1517 0
 1514  1515  1516 -118 -1518 0
 1514  1515  1516 -118  1519 0

c  1+1 --> 2
c    (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0 ∧  p_118) -> (-b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0)
c  in CNF:
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_2
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨  b^{1, 119}_1
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ -p_118 ∨ -b^{1, 119}_0
c  in DIMACS:
 1514  1515 -1516 -118 -1517 0
 1514  1515 -1516 -118  1518 0
 1514  1515 -1516 -118 -1519 0

c  2+1 --> break 
c    (-b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧  p_118) -> break
c  in CNF:
c     b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ -p_118 ∨ break
c  in DIMACS:
 1514 -1515  1516 -118 1162 0


c  2-1 --> 1
c    (-b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧ -p_118) -> (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0)
c  in CNF:
c     b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_2
c     b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_1
c     b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨  b^{1, 119}_0
c  in DIMACS:
 1514 -1515  1516  118 -1517 0
 1514 -1515  1516  118 -1518 0
 1514 -1515  1516  118  1519 0

c  1-1 --> 0
c    (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0 ∧ -p_118) -> (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧ -b^{1, 119}_0)
c  in CNF:
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_2
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_1
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_0
c  in DIMACS:
 1514  1515 -1516  118 -1517 0
 1514  1515 -1516  118 -1518 0
 1514  1515 -1516  118 -1519 0

c  0-1 --> -1
c    (-b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧ -p_118) -> ( b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0)
c  in CNF:
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨  b^{1, 119}_2
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_1
c     b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨  b^{1, 119}_0
c  in DIMACS:
 1514  1515  1516  118  1517 0
 1514  1515  1516  118 -1518 0
 1514  1515  1516  118  1519 0

c  -1-1 --> -2
c    ( b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧  b^{1, 118}_0 ∧ -p_118) -> ( b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0)
c  in CNF:
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨  b^{1, 119}_2
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨  b^{1, 119}_1
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨  p_118 ∨ -b^{1, 119}_0
c  in DIMACS:
-1514  1515 -1516  118  1517 0
-1514  1515 -1516  118  1518 0
-1514  1515 -1516  118 -1519 0

c  -2-1 --> break 
c    ( b^{1, 118}_2 ∧  b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧ -p_118) -> break
c  in CNF:
c    -b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨  b^{1, 118}_0 ∨  p_118 ∨ break
c  in DIMACS:
-1514 -1515  1516  118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 118}_2 ∧ -b^{1, 118}_1 ∧ -b^{1, 118}_0 ∧ true) 
c  in CNF:
c    -b^{1, 118}_2 ∨  b^{1, 118}_1 ∨  b^{1, 118}_0 ∨ false 
c  in DIMACS:
-1514  1515  1516  0

c  3 does not represent an automaton state.
c    -(-b^{1, 118}_2 ∧  b^{1, 118}_1 ∧  b^{1, 118}_0 ∧ true) 
c  in CNF:
c     b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ false 
c  in DIMACS:
 1514 -1515 -1516  0
c  -3 does not represent an automaton state.
c    -( b^{1, 118}_2 ∧  b^{1, 118}_1 ∧  b^{1, 118}_0 ∧ true) 
c  in CNF:
c    -b^{1, 118}_2 ∨ -b^{1, 118}_1 ∨ -b^{1, 118}_0 ∨ false 
c  in DIMACS:
-1514 -1515 -1516  0

c i = 119
c  -2+1 --> -1
c    ( b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧  p_119) -> ( b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0)
c  in CNF:
c    -b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨  b^{1, 120}_2
c    -b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_1
c    -b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨  b^{1, 120}_0
c  in DIMACS:
-1517 -1518  1519 -119  1520 0
-1517 -1518  1519 -119 -1521 0
-1517 -1518  1519 -119  1522 0

c  -1+1 --> 0
c    ( b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0 ∧  p_119) -> (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧ -b^{1, 120}_0)
c  in CNF:
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_2
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_1
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_0
c  in DIMACS:
-1517  1518 -1519 -119 -1520 0
-1517  1518 -1519 -119 -1521 0
-1517  1518 -1519 -119 -1522 0

c  0+1 --> 1
c    (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧  p_119) -> (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0)
c  in CNF:
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_2
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_1
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨  b^{1, 120}_0
c  in DIMACS:
 1517  1518  1519 -119 -1520 0
 1517  1518  1519 -119 -1521 0
 1517  1518  1519 -119  1522 0

c  1+1 --> 2
c    (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0 ∧  p_119) -> (-b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0)
c  in CNF:
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_2
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨  b^{1, 120}_1
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ -p_119 ∨ -b^{1, 120}_0
c  in DIMACS:
 1517  1518 -1519 -119 -1520 0
 1517  1518 -1519 -119  1521 0
 1517  1518 -1519 -119 -1522 0

c  2+1 --> break 
c    (-b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧  p_119) -> break
c  in CNF:
c     b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ -p_119 ∨ break
c  in DIMACS:
 1517 -1518  1519 -119 1162 0


c  2-1 --> 1
c    (-b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧ -p_119) -> (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0)
c  in CNF:
c     b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_2
c     b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_1
c     b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨  b^{1, 120}_0
c  in DIMACS:
 1517 -1518  1519  119 -1520 0
 1517 -1518  1519  119 -1521 0
 1517 -1518  1519  119  1522 0

c  1-1 --> 0
c    (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0 ∧ -p_119) -> (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧ -b^{1, 120}_0)
c  in CNF:
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_2
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_1
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_0
c  in DIMACS:
 1517  1518 -1519  119 -1520 0
 1517  1518 -1519  119 -1521 0
 1517  1518 -1519  119 -1522 0

c  0-1 --> -1
c    (-b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧ -p_119) -> ( b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0)
c  in CNF:
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨  b^{1, 120}_2
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_1
c     b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨  b^{1, 120}_0
c  in DIMACS:
 1517  1518  1519  119  1520 0
 1517  1518  1519  119 -1521 0
 1517  1518  1519  119  1522 0

c  -1-1 --> -2
c    ( b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧  b^{1, 119}_0 ∧ -p_119) -> ( b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0)
c  in CNF:
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨  b^{1, 120}_2
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨  b^{1, 120}_1
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨  p_119 ∨ -b^{1, 120}_0
c  in DIMACS:
-1517  1518 -1519  119  1520 0
-1517  1518 -1519  119  1521 0
-1517  1518 -1519  119 -1522 0

c  -2-1 --> break 
c    ( b^{1, 119}_2 ∧  b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧ -p_119) -> break
c  in CNF:
c    -b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨  b^{1, 119}_0 ∨  p_119 ∨ break
c  in DIMACS:
-1517 -1518  1519  119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 119}_2 ∧ -b^{1, 119}_1 ∧ -b^{1, 119}_0 ∧ true) 
c  in CNF:
c    -b^{1, 119}_2 ∨  b^{1, 119}_1 ∨  b^{1, 119}_0 ∨ false 
c  in DIMACS:
-1517  1518  1519  0

c  3 does not represent an automaton state.
c    -(-b^{1, 119}_2 ∧  b^{1, 119}_1 ∧  b^{1, 119}_0 ∧ true) 
c  in CNF:
c     b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ false 
c  in DIMACS:
 1517 -1518 -1519  0
c  -3 does not represent an automaton state.
c    -( b^{1, 119}_2 ∧  b^{1, 119}_1 ∧  b^{1, 119}_0 ∧ true) 
c  in CNF:
c    -b^{1, 119}_2 ∨ -b^{1, 119}_1 ∨ -b^{1, 119}_0 ∨ false 
c  in DIMACS:
-1517 -1518 -1519  0

c i = 120
c  -2+1 --> -1
c    ( b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧  p_120) -> ( b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0)
c  in CNF:
c    -b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨  b^{1, 121}_2
c    -b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_1
c    -b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨  b^{1, 121}_0
c  in DIMACS:
-1520 -1521  1522 -120  1523 0
-1520 -1521  1522 -120 -1524 0
-1520 -1521  1522 -120  1525 0

c  -1+1 --> 0
c    ( b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0 ∧  p_120) -> (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧ -b^{1, 121}_0)
c  in CNF:
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_2
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_1
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_0
c  in DIMACS:
-1520  1521 -1522 -120 -1523 0
-1520  1521 -1522 -120 -1524 0
-1520  1521 -1522 -120 -1525 0

c  0+1 --> 1
c    (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧  p_120) -> (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0)
c  in CNF:
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_2
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_1
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨  b^{1, 121}_0
c  in DIMACS:
 1520  1521  1522 -120 -1523 0
 1520  1521  1522 -120 -1524 0
 1520  1521  1522 -120  1525 0

c  1+1 --> 2
c    (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0 ∧  p_120) -> (-b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0)
c  in CNF:
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_2
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨  b^{1, 121}_1
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ -p_120 ∨ -b^{1, 121}_0
c  in DIMACS:
 1520  1521 -1522 -120 -1523 0
 1520  1521 -1522 -120  1524 0
 1520  1521 -1522 -120 -1525 0

c  2+1 --> break 
c    (-b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧  p_120) -> break
c  in CNF:
c     b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 1520 -1521  1522 -120 1162 0


c  2-1 --> 1
c    (-b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧ -p_120) -> (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0)
c  in CNF:
c     b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_2
c     b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_1
c     b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨  b^{1, 121}_0
c  in DIMACS:
 1520 -1521  1522  120 -1523 0
 1520 -1521  1522  120 -1524 0
 1520 -1521  1522  120  1525 0

c  1-1 --> 0
c    (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0 ∧ -p_120) -> (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧ -b^{1, 121}_0)
c  in CNF:
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_2
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_1
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_0
c  in DIMACS:
 1520  1521 -1522  120 -1523 0
 1520  1521 -1522  120 -1524 0
 1520  1521 -1522  120 -1525 0

c  0-1 --> -1
c    (-b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧ -p_120) -> ( b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0)
c  in CNF:
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨  b^{1, 121}_2
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_1
c     b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨  b^{1, 121}_0
c  in DIMACS:
 1520  1521  1522  120  1523 0
 1520  1521  1522  120 -1524 0
 1520  1521  1522  120  1525 0

c  -1-1 --> -2
c    ( b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧  b^{1, 120}_0 ∧ -p_120) -> ( b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0)
c  in CNF:
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨  b^{1, 121}_2
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨  b^{1, 121}_1
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨  p_120 ∨ -b^{1, 121}_0
c  in DIMACS:
-1520  1521 -1522  120  1523 0
-1520  1521 -1522  120  1524 0
-1520  1521 -1522  120 -1525 0

c  -2-1 --> break 
c    ( b^{1, 120}_2 ∧  b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨  b^{1, 120}_0 ∨  p_120 ∨ break
c  in DIMACS:
-1520 -1521  1522  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 120}_2 ∧ -b^{1, 120}_1 ∧ -b^{1, 120}_0 ∧ true) 
c  in CNF:
c    -b^{1, 120}_2 ∨  b^{1, 120}_1 ∨  b^{1, 120}_0 ∨ false 
c  in DIMACS:
-1520  1521  1522  0

c  3 does not represent an automaton state.
c    -(-b^{1, 120}_2 ∧  b^{1, 120}_1 ∧  b^{1, 120}_0 ∧ true) 
c  in CNF:
c     b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ false 
c  in DIMACS:
 1520 -1521 -1522  0
c  -3 does not represent an automaton state.
c    -( b^{1, 120}_2 ∧  b^{1, 120}_1 ∧  b^{1, 120}_0 ∧ true) 
c  in CNF:
c    -b^{1, 120}_2 ∨ -b^{1, 120}_1 ∨ -b^{1, 120}_0 ∨ false 
c  in DIMACS:
-1520 -1521 -1522  0

c i = 121
c  -2+1 --> -1
c    ( b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧  p_121) -> ( b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0)
c  in CNF:
c    -b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨  b^{1, 122}_2
c    -b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_1
c    -b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨  b^{1, 122}_0
c  in DIMACS:
-1523 -1524  1525 -121  1526 0
-1523 -1524  1525 -121 -1527 0
-1523 -1524  1525 -121  1528 0

c  -1+1 --> 0
c    ( b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0 ∧  p_121) -> (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧ -b^{1, 122}_0)
c  in CNF:
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_2
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_1
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_0
c  in DIMACS:
-1523  1524 -1525 -121 -1526 0
-1523  1524 -1525 -121 -1527 0
-1523  1524 -1525 -121 -1528 0

c  0+1 --> 1
c    (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧  p_121) -> (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0)
c  in CNF:
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_2
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_1
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨  b^{1, 122}_0
c  in DIMACS:
 1523  1524  1525 -121 -1526 0
 1523  1524  1525 -121 -1527 0
 1523  1524  1525 -121  1528 0

c  1+1 --> 2
c    (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0 ∧  p_121) -> (-b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0)
c  in CNF:
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_2
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨  b^{1, 122}_1
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ -p_121 ∨ -b^{1, 122}_0
c  in DIMACS:
 1523  1524 -1525 -121 -1526 0
 1523  1524 -1525 -121  1527 0
 1523  1524 -1525 -121 -1528 0

c  2+1 --> break 
c    (-b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧  p_121) -> break
c  in CNF:
c     b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ -p_121 ∨ break
c  in DIMACS:
 1523 -1524  1525 -121 1162 0


c  2-1 --> 1
c    (-b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧ -p_121) -> (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0)
c  in CNF:
c     b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_2
c     b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_1
c     b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨  b^{1, 122}_0
c  in DIMACS:
 1523 -1524  1525  121 -1526 0
 1523 -1524  1525  121 -1527 0
 1523 -1524  1525  121  1528 0

c  1-1 --> 0
c    (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0 ∧ -p_121) -> (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧ -b^{1, 122}_0)
c  in CNF:
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_2
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_1
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_0
c  in DIMACS:
 1523  1524 -1525  121 -1526 0
 1523  1524 -1525  121 -1527 0
 1523  1524 -1525  121 -1528 0

c  0-1 --> -1
c    (-b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧ -p_121) -> ( b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0)
c  in CNF:
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨  b^{1, 122}_2
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_1
c     b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨  b^{1, 122}_0
c  in DIMACS:
 1523  1524  1525  121  1526 0
 1523  1524  1525  121 -1527 0
 1523  1524  1525  121  1528 0

c  -1-1 --> -2
c    ( b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧  b^{1, 121}_0 ∧ -p_121) -> ( b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0)
c  in CNF:
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨  b^{1, 122}_2
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨  b^{1, 122}_1
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨  p_121 ∨ -b^{1, 122}_0
c  in DIMACS:
-1523  1524 -1525  121  1526 0
-1523  1524 -1525  121  1527 0
-1523  1524 -1525  121 -1528 0

c  -2-1 --> break 
c    ( b^{1, 121}_2 ∧  b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧ -p_121) -> break
c  in CNF:
c    -b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨  b^{1, 121}_0 ∨  p_121 ∨ break
c  in DIMACS:
-1523 -1524  1525  121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 121}_2 ∧ -b^{1, 121}_1 ∧ -b^{1, 121}_0 ∧ true) 
c  in CNF:
c    -b^{1, 121}_2 ∨  b^{1, 121}_1 ∨  b^{1, 121}_0 ∨ false 
c  in DIMACS:
-1523  1524  1525  0

c  3 does not represent an automaton state.
c    -(-b^{1, 121}_2 ∧  b^{1, 121}_1 ∧  b^{1, 121}_0 ∧ true) 
c  in CNF:
c     b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ false 
c  in DIMACS:
 1523 -1524 -1525  0
c  -3 does not represent an automaton state.
c    -( b^{1, 121}_2 ∧  b^{1, 121}_1 ∧  b^{1, 121}_0 ∧ true) 
c  in CNF:
c    -b^{1, 121}_2 ∨ -b^{1, 121}_1 ∨ -b^{1, 121}_0 ∨ false 
c  in DIMACS:
-1523 -1524 -1525  0

c i = 122
c  -2+1 --> -1
c    ( b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧  p_122) -> ( b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0)
c  in CNF:
c    -b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨  b^{1, 123}_2
c    -b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_1
c    -b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨  b^{1, 123}_0
c  in DIMACS:
-1526 -1527  1528 -122  1529 0
-1526 -1527  1528 -122 -1530 0
-1526 -1527  1528 -122  1531 0

c  -1+1 --> 0
c    ( b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0 ∧  p_122) -> (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧ -b^{1, 123}_0)
c  in CNF:
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_2
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_1
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_0
c  in DIMACS:
-1526  1527 -1528 -122 -1529 0
-1526  1527 -1528 -122 -1530 0
-1526  1527 -1528 -122 -1531 0

c  0+1 --> 1
c    (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧  p_122) -> (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0)
c  in CNF:
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_2
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_1
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨  b^{1, 123}_0
c  in DIMACS:
 1526  1527  1528 -122 -1529 0
 1526  1527  1528 -122 -1530 0
 1526  1527  1528 -122  1531 0

c  1+1 --> 2
c    (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0 ∧  p_122) -> (-b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0)
c  in CNF:
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_2
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨  b^{1, 123}_1
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ -p_122 ∨ -b^{1, 123}_0
c  in DIMACS:
 1526  1527 -1528 -122 -1529 0
 1526  1527 -1528 -122  1530 0
 1526  1527 -1528 -122 -1531 0

c  2+1 --> break 
c    (-b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧  p_122) -> break
c  in CNF:
c     b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ -p_122 ∨ break
c  in DIMACS:
 1526 -1527  1528 -122 1162 0


c  2-1 --> 1
c    (-b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧ -p_122) -> (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0)
c  in CNF:
c     b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_2
c     b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_1
c     b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨  b^{1, 123}_0
c  in DIMACS:
 1526 -1527  1528  122 -1529 0
 1526 -1527  1528  122 -1530 0
 1526 -1527  1528  122  1531 0

c  1-1 --> 0
c    (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0 ∧ -p_122) -> (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧ -b^{1, 123}_0)
c  in CNF:
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_2
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_1
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_0
c  in DIMACS:
 1526  1527 -1528  122 -1529 0
 1526  1527 -1528  122 -1530 0
 1526  1527 -1528  122 -1531 0

c  0-1 --> -1
c    (-b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧ -p_122) -> ( b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0)
c  in CNF:
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨  b^{1, 123}_2
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_1
c     b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨  b^{1, 123}_0
c  in DIMACS:
 1526  1527  1528  122  1529 0
 1526  1527  1528  122 -1530 0
 1526  1527  1528  122  1531 0

c  -1-1 --> -2
c    ( b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧  b^{1, 122}_0 ∧ -p_122) -> ( b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0)
c  in CNF:
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨  b^{1, 123}_2
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨  b^{1, 123}_1
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨  p_122 ∨ -b^{1, 123}_0
c  in DIMACS:
-1526  1527 -1528  122  1529 0
-1526  1527 -1528  122  1530 0
-1526  1527 -1528  122 -1531 0

c  -2-1 --> break 
c    ( b^{1, 122}_2 ∧  b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧ -p_122) -> break
c  in CNF:
c    -b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨  b^{1, 122}_0 ∨  p_122 ∨ break
c  in DIMACS:
-1526 -1527  1528  122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 122}_2 ∧ -b^{1, 122}_1 ∧ -b^{1, 122}_0 ∧ true) 
c  in CNF:
c    -b^{1, 122}_2 ∨  b^{1, 122}_1 ∨  b^{1, 122}_0 ∨ false 
c  in DIMACS:
-1526  1527  1528  0

c  3 does not represent an automaton state.
c    -(-b^{1, 122}_2 ∧  b^{1, 122}_1 ∧  b^{1, 122}_0 ∧ true) 
c  in CNF:
c     b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ false 
c  in DIMACS:
 1526 -1527 -1528  0
c  -3 does not represent an automaton state.
c    -( b^{1, 122}_2 ∧  b^{1, 122}_1 ∧  b^{1, 122}_0 ∧ true) 
c  in CNF:
c    -b^{1, 122}_2 ∨ -b^{1, 122}_1 ∨ -b^{1, 122}_0 ∨ false 
c  in DIMACS:
-1526 -1527 -1528  0

c i = 123
c  -2+1 --> -1
c    ( b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧  p_123) -> ( b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0)
c  in CNF:
c    -b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨  b^{1, 124}_2
c    -b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_1
c    -b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨  b^{1, 124}_0
c  in DIMACS:
-1529 -1530  1531 -123  1532 0
-1529 -1530  1531 -123 -1533 0
-1529 -1530  1531 -123  1534 0

c  -1+1 --> 0
c    ( b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0 ∧  p_123) -> (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧ -b^{1, 124}_0)
c  in CNF:
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_2
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_1
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_0
c  in DIMACS:
-1529  1530 -1531 -123 -1532 0
-1529  1530 -1531 -123 -1533 0
-1529  1530 -1531 -123 -1534 0

c  0+1 --> 1
c    (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧  p_123) -> (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0)
c  in CNF:
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_2
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_1
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨  b^{1, 124}_0
c  in DIMACS:
 1529  1530  1531 -123 -1532 0
 1529  1530  1531 -123 -1533 0
 1529  1530  1531 -123  1534 0

c  1+1 --> 2
c    (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0 ∧  p_123) -> (-b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0)
c  in CNF:
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_2
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨  b^{1, 124}_1
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ -p_123 ∨ -b^{1, 124}_0
c  in DIMACS:
 1529  1530 -1531 -123 -1532 0
 1529  1530 -1531 -123  1533 0
 1529  1530 -1531 -123 -1534 0

c  2+1 --> break 
c    (-b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧  p_123) -> break
c  in CNF:
c     b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ -p_123 ∨ break
c  in DIMACS:
 1529 -1530  1531 -123 1162 0


c  2-1 --> 1
c    (-b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧ -p_123) -> (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0)
c  in CNF:
c     b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_2
c     b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_1
c     b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨  b^{1, 124}_0
c  in DIMACS:
 1529 -1530  1531  123 -1532 0
 1529 -1530  1531  123 -1533 0
 1529 -1530  1531  123  1534 0

c  1-1 --> 0
c    (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0 ∧ -p_123) -> (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧ -b^{1, 124}_0)
c  in CNF:
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_2
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_1
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_0
c  in DIMACS:
 1529  1530 -1531  123 -1532 0
 1529  1530 -1531  123 -1533 0
 1529  1530 -1531  123 -1534 0

c  0-1 --> -1
c    (-b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧ -p_123) -> ( b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0)
c  in CNF:
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨  b^{1, 124}_2
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_1
c     b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨  b^{1, 124}_0
c  in DIMACS:
 1529  1530  1531  123  1532 0
 1529  1530  1531  123 -1533 0
 1529  1530  1531  123  1534 0

c  -1-1 --> -2
c    ( b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧  b^{1, 123}_0 ∧ -p_123) -> ( b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0)
c  in CNF:
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨  b^{1, 124}_2
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨  b^{1, 124}_1
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨  p_123 ∨ -b^{1, 124}_0
c  in DIMACS:
-1529  1530 -1531  123  1532 0
-1529  1530 -1531  123  1533 0
-1529  1530 -1531  123 -1534 0

c  -2-1 --> break 
c    ( b^{1, 123}_2 ∧  b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧ -p_123) -> break
c  in CNF:
c    -b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨  b^{1, 123}_0 ∨  p_123 ∨ break
c  in DIMACS:
-1529 -1530  1531  123 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 123}_2 ∧ -b^{1, 123}_1 ∧ -b^{1, 123}_0 ∧ true) 
c  in CNF:
c    -b^{1, 123}_2 ∨  b^{1, 123}_1 ∨  b^{1, 123}_0 ∨ false 
c  in DIMACS:
-1529  1530  1531  0

c  3 does not represent an automaton state.
c    -(-b^{1, 123}_2 ∧  b^{1, 123}_1 ∧  b^{1, 123}_0 ∧ true) 
c  in CNF:
c     b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ false 
c  in DIMACS:
 1529 -1530 -1531  0
c  -3 does not represent an automaton state.
c    -( b^{1, 123}_2 ∧  b^{1, 123}_1 ∧  b^{1, 123}_0 ∧ true) 
c  in CNF:
c    -b^{1, 123}_2 ∨ -b^{1, 123}_1 ∨ -b^{1, 123}_0 ∨ false 
c  in DIMACS:
-1529 -1530 -1531  0

c i = 124
c  -2+1 --> -1
c    ( b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧  p_124) -> ( b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0)
c  in CNF:
c    -b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨  b^{1, 125}_2
c    -b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_1
c    -b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨  b^{1, 125}_0
c  in DIMACS:
-1532 -1533  1534 -124  1535 0
-1532 -1533  1534 -124 -1536 0
-1532 -1533  1534 -124  1537 0

c  -1+1 --> 0
c    ( b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0 ∧  p_124) -> (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧ -b^{1, 125}_0)
c  in CNF:
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_2
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_1
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_0
c  in DIMACS:
-1532  1533 -1534 -124 -1535 0
-1532  1533 -1534 -124 -1536 0
-1532  1533 -1534 -124 -1537 0

c  0+1 --> 1
c    (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧  p_124) -> (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0)
c  in CNF:
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_2
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_1
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨  b^{1, 125}_0
c  in DIMACS:
 1532  1533  1534 -124 -1535 0
 1532  1533  1534 -124 -1536 0
 1532  1533  1534 -124  1537 0

c  1+1 --> 2
c    (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0 ∧  p_124) -> (-b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0)
c  in CNF:
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_2
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨  b^{1, 125}_1
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ -p_124 ∨ -b^{1, 125}_0
c  in DIMACS:
 1532  1533 -1534 -124 -1535 0
 1532  1533 -1534 -124  1536 0
 1532  1533 -1534 -124 -1537 0

c  2+1 --> break 
c    (-b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧  p_124) -> break
c  in CNF:
c     b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 1532 -1533  1534 -124 1162 0


c  2-1 --> 1
c    (-b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧ -p_124) -> (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0)
c  in CNF:
c     b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_2
c     b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_1
c     b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨  b^{1, 125}_0
c  in DIMACS:
 1532 -1533  1534  124 -1535 0
 1532 -1533  1534  124 -1536 0
 1532 -1533  1534  124  1537 0

c  1-1 --> 0
c    (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0 ∧ -p_124) -> (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧ -b^{1, 125}_0)
c  in CNF:
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_2
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_1
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_0
c  in DIMACS:
 1532  1533 -1534  124 -1535 0
 1532  1533 -1534  124 -1536 0
 1532  1533 -1534  124 -1537 0

c  0-1 --> -1
c    (-b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧ -p_124) -> ( b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0)
c  in CNF:
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨  b^{1, 125}_2
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_1
c     b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨  b^{1, 125}_0
c  in DIMACS:
 1532  1533  1534  124  1535 0
 1532  1533  1534  124 -1536 0
 1532  1533  1534  124  1537 0

c  -1-1 --> -2
c    ( b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧  b^{1, 124}_0 ∧ -p_124) -> ( b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0)
c  in CNF:
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨  b^{1, 125}_2
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨  b^{1, 125}_1
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨  p_124 ∨ -b^{1, 125}_0
c  in DIMACS:
-1532  1533 -1534  124  1535 0
-1532  1533 -1534  124  1536 0
-1532  1533 -1534  124 -1537 0

c  -2-1 --> break 
c    ( b^{1, 124}_2 ∧  b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨  b^{1, 124}_0 ∨  p_124 ∨ break
c  in DIMACS:
-1532 -1533  1534  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 124}_2 ∧ -b^{1, 124}_1 ∧ -b^{1, 124}_0 ∧ true) 
c  in CNF:
c    -b^{1, 124}_2 ∨  b^{1, 124}_1 ∨  b^{1, 124}_0 ∨ false 
c  in DIMACS:
-1532  1533  1534  0

c  3 does not represent an automaton state.
c    -(-b^{1, 124}_2 ∧  b^{1, 124}_1 ∧  b^{1, 124}_0 ∧ true) 
c  in CNF:
c     b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ false 
c  in DIMACS:
 1532 -1533 -1534  0
c  -3 does not represent an automaton state.
c    -( b^{1, 124}_2 ∧  b^{1, 124}_1 ∧  b^{1, 124}_0 ∧ true) 
c  in CNF:
c    -b^{1, 124}_2 ∨ -b^{1, 124}_1 ∨ -b^{1, 124}_0 ∨ false 
c  in DIMACS:
-1532 -1533 -1534  0

c i = 125
c  -2+1 --> -1
c    ( b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧  p_125) -> ( b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0)
c  in CNF:
c    -b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨  b^{1, 126}_2
c    -b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_1
c    -b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨  b^{1, 126}_0
c  in DIMACS:
-1535 -1536  1537 -125  1538 0
-1535 -1536  1537 -125 -1539 0
-1535 -1536  1537 -125  1540 0

c  -1+1 --> 0
c    ( b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0 ∧  p_125) -> (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧ -b^{1, 126}_0)
c  in CNF:
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_2
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_1
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_0
c  in DIMACS:
-1535  1536 -1537 -125 -1538 0
-1535  1536 -1537 -125 -1539 0
-1535  1536 -1537 -125 -1540 0

c  0+1 --> 1
c    (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧  p_125) -> (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0)
c  in CNF:
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_2
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_1
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨  b^{1, 126}_0
c  in DIMACS:
 1535  1536  1537 -125 -1538 0
 1535  1536  1537 -125 -1539 0
 1535  1536  1537 -125  1540 0

c  1+1 --> 2
c    (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0 ∧  p_125) -> (-b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0)
c  in CNF:
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_2
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨  b^{1, 126}_1
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ -p_125 ∨ -b^{1, 126}_0
c  in DIMACS:
 1535  1536 -1537 -125 -1538 0
 1535  1536 -1537 -125  1539 0
 1535  1536 -1537 -125 -1540 0

c  2+1 --> break 
c    (-b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧  p_125) -> break
c  in CNF:
c     b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ -p_125 ∨ break
c  in DIMACS:
 1535 -1536  1537 -125 1162 0


c  2-1 --> 1
c    (-b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧ -p_125) -> (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0)
c  in CNF:
c     b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_2
c     b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_1
c     b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨  b^{1, 126}_0
c  in DIMACS:
 1535 -1536  1537  125 -1538 0
 1535 -1536  1537  125 -1539 0
 1535 -1536  1537  125  1540 0

c  1-1 --> 0
c    (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0 ∧ -p_125) -> (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧ -b^{1, 126}_0)
c  in CNF:
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_2
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_1
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_0
c  in DIMACS:
 1535  1536 -1537  125 -1538 0
 1535  1536 -1537  125 -1539 0
 1535  1536 -1537  125 -1540 0

c  0-1 --> -1
c    (-b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧ -p_125) -> ( b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0)
c  in CNF:
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨  b^{1, 126}_2
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_1
c     b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨  b^{1, 126}_0
c  in DIMACS:
 1535  1536  1537  125  1538 0
 1535  1536  1537  125 -1539 0
 1535  1536  1537  125  1540 0

c  -1-1 --> -2
c    ( b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧  b^{1, 125}_0 ∧ -p_125) -> ( b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0)
c  in CNF:
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨  b^{1, 126}_2
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨  b^{1, 126}_1
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨  p_125 ∨ -b^{1, 126}_0
c  in DIMACS:
-1535  1536 -1537  125  1538 0
-1535  1536 -1537  125  1539 0
-1535  1536 -1537  125 -1540 0

c  -2-1 --> break 
c    ( b^{1, 125}_2 ∧  b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧ -p_125) -> break
c  in CNF:
c    -b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨  b^{1, 125}_0 ∨  p_125 ∨ break
c  in DIMACS:
-1535 -1536  1537  125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 125}_2 ∧ -b^{1, 125}_1 ∧ -b^{1, 125}_0 ∧ true) 
c  in CNF:
c    -b^{1, 125}_2 ∨  b^{1, 125}_1 ∨  b^{1, 125}_0 ∨ false 
c  in DIMACS:
-1535  1536  1537  0

c  3 does not represent an automaton state.
c    -(-b^{1, 125}_2 ∧  b^{1, 125}_1 ∧  b^{1, 125}_0 ∧ true) 
c  in CNF:
c     b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ false 
c  in DIMACS:
 1535 -1536 -1537  0
c  -3 does not represent an automaton state.
c    -( b^{1, 125}_2 ∧  b^{1, 125}_1 ∧  b^{1, 125}_0 ∧ true) 
c  in CNF:
c    -b^{1, 125}_2 ∨ -b^{1, 125}_1 ∨ -b^{1, 125}_0 ∨ false 
c  in DIMACS:
-1535 -1536 -1537  0

c i = 126
c  -2+1 --> -1
c    ( b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧  p_126) -> ( b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0)
c  in CNF:
c    -b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨  b^{1, 127}_2
c    -b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_1
c    -b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨  b^{1, 127}_0
c  in DIMACS:
-1538 -1539  1540 -126  1541 0
-1538 -1539  1540 -126 -1542 0
-1538 -1539  1540 -126  1543 0

c  -1+1 --> 0
c    ( b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0 ∧  p_126) -> (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧ -b^{1, 127}_0)
c  in CNF:
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_2
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_1
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_0
c  in DIMACS:
-1538  1539 -1540 -126 -1541 0
-1538  1539 -1540 -126 -1542 0
-1538  1539 -1540 -126 -1543 0

c  0+1 --> 1
c    (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧  p_126) -> (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0)
c  in CNF:
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_2
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_1
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨  b^{1, 127}_0
c  in DIMACS:
 1538  1539  1540 -126 -1541 0
 1538  1539  1540 -126 -1542 0
 1538  1539  1540 -126  1543 0

c  1+1 --> 2
c    (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0 ∧  p_126) -> (-b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0)
c  in CNF:
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_2
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨  b^{1, 127}_1
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ -p_126 ∨ -b^{1, 127}_0
c  in DIMACS:
 1538  1539 -1540 -126 -1541 0
 1538  1539 -1540 -126  1542 0
 1538  1539 -1540 -126 -1543 0

c  2+1 --> break 
c    (-b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧  p_126) -> break
c  in CNF:
c     b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 1538 -1539  1540 -126 1162 0


c  2-1 --> 1
c    (-b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧ -p_126) -> (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0)
c  in CNF:
c     b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_2
c     b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_1
c     b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨  b^{1, 127}_0
c  in DIMACS:
 1538 -1539  1540  126 -1541 0
 1538 -1539  1540  126 -1542 0
 1538 -1539  1540  126  1543 0

c  1-1 --> 0
c    (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0 ∧ -p_126) -> (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧ -b^{1, 127}_0)
c  in CNF:
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_2
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_1
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_0
c  in DIMACS:
 1538  1539 -1540  126 -1541 0
 1538  1539 -1540  126 -1542 0
 1538  1539 -1540  126 -1543 0

c  0-1 --> -1
c    (-b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧ -p_126) -> ( b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0)
c  in CNF:
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨  b^{1, 127}_2
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_1
c     b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨  b^{1, 127}_0
c  in DIMACS:
 1538  1539  1540  126  1541 0
 1538  1539  1540  126 -1542 0
 1538  1539  1540  126  1543 0

c  -1-1 --> -2
c    ( b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧  b^{1, 126}_0 ∧ -p_126) -> ( b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0)
c  in CNF:
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨  b^{1, 127}_2
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨  b^{1, 127}_1
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨  p_126 ∨ -b^{1, 127}_0
c  in DIMACS:
-1538  1539 -1540  126  1541 0
-1538  1539 -1540  126  1542 0
-1538  1539 -1540  126 -1543 0

c  -2-1 --> break 
c    ( b^{1, 126}_2 ∧  b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨  b^{1, 126}_0 ∨  p_126 ∨ break
c  in DIMACS:
-1538 -1539  1540  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 126}_2 ∧ -b^{1, 126}_1 ∧ -b^{1, 126}_0 ∧ true) 
c  in CNF:
c    -b^{1, 126}_2 ∨  b^{1, 126}_1 ∨  b^{1, 126}_0 ∨ false 
c  in DIMACS:
-1538  1539  1540  0

c  3 does not represent an automaton state.
c    -(-b^{1, 126}_2 ∧  b^{1, 126}_1 ∧  b^{1, 126}_0 ∧ true) 
c  in CNF:
c     b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ false 
c  in DIMACS:
 1538 -1539 -1540  0
c  -3 does not represent an automaton state.
c    -( b^{1, 126}_2 ∧  b^{1, 126}_1 ∧  b^{1, 126}_0 ∧ true) 
c  in CNF:
c    -b^{1, 126}_2 ∨ -b^{1, 126}_1 ∨ -b^{1, 126}_0 ∨ false 
c  in DIMACS:
-1538 -1539 -1540  0

c i = 127
c  -2+1 --> -1
c    ( b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧  p_127) -> ( b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0)
c  in CNF:
c    -b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨  b^{1, 128}_2
c    -b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_1
c    -b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨  b^{1, 128}_0
c  in DIMACS:
-1541 -1542  1543 -127  1544 0
-1541 -1542  1543 -127 -1545 0
-1541 -1542  1543 -127  1546 0

c  -1+1 --> 0
c    ( b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0 ∧  p_127) -> (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧ -b^{1, 128}_0)
c  in CNF:
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_2
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_1
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_0
c  in DIMACS:
-1541  1542 -1543 -127 -1544 0
-1541  1542 -1543 -127 -1545 0
-1541  1542 -1543 -127 -1546 0

c  0+1 --> 1
c    (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧  p_127) -> (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0)
c  in CNF:
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_2
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_1
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨  b^{1, 128}_0
c  in DIMACS:
 1541  1542  1543 -127 -1544 0
 1541  1542  1543 -127 -1545 0
 1541  1542  1543 -127  1546 0

c  1+1 --> 2
c    (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0 ∧  p_127) -> (-b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0)
c  in CNF:
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_2
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨  b^{1, 128}_1
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ -p_127 ∨ -b^{1, 128}_0
c  in DIMACS:
 1541  1542 -1543 -127 -1544 0
 1541  1542 -1543 -127  1545 0
 1541  1542 -1543 -127 -1546 0

c  2+1 --> break 
c    (-b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧  p_127) -> break
c  in CNF:
c     b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ -p_127 ∨ break
c  in DIMACS:
 1541 -1542  1543 -127 1162 0


c  2-1 --> 1
c    (-b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧ -p_127) -> (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0)
c  in CNF:
c     b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_2
c     b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_1
c     b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨  b^{1, 128}_0
c  in DIMACS:
 1541 -1542  1543  127 -1544 0
 1541 -1542  1543  127 -1545 0
 1541 -1542  1543  127  1546 0

c  1-1 --> 0
c    (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0 ∧ -p_127) -> (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧ -b^{1, 128}_0)
c  in CNF:
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_2
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_1
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_0
c  in DIMACS:
 1541  1542 -1543  127 -1544 0
 1541  1542 -1543  127 -1545 0
 1541  1542 -1543  127 -1546 0

c  0-1 --> -1
c    (-b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧ -p_127) -> ( b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0)
c  in CNF:
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨  b^{1, 128}_2
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_1
c     b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨  b^{1, 128}_0
c  in DIMACS:
 1541  1542  1543  127  1544 0
 1541  1542  1543  127 -1545 0
 1541  1542  1543  127  1546 0

c  -1-1 --> -2
c    ( b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧  b^{1, 127}_0 ∧ -p_127) -> ( b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0)
c  in CNF:
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨  b^{1, 128}_2
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨  b^{1, 128}_1
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨  p_127 ∨ -b^{1, 128}_0
c  in DIMACS:
-1541  1542 -1543  127  1544 0
-1541  1542 -1543  127  1545 0
-1541  1542 -1543  127 -1546 0

c  -2-1 --> break 
c    ( b^{1, 127}_2 ∧  b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧ -p_127) -> break
c  in CNF:
c    -b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨  b^{1, 127}_0 ∨  p_127 ∨ break
c  in DIMACS:
-1541 -1542  1543  127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 127}_2 ∧ -b^{1, 127}_1 ∧ -b^{1, 127}_0 ∧ true) 
c  in CNF:
c    -b^{1, 127}_2 ∨  b^{1, 127}_1 ∨  b^{1, 127}_0 ∨ false 
c  in DIMACS:
-1541  1542  1543  0

c  3 does not represent an automaton state.
c    -(-b^{1, 127}_2 ∧  b^{1, 127}_1 ∧  b^{1, 127}_0 ∧ true) 
c  in CNF:
c     b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ false 
c  in DIMACS:
 1541 -1542 -1543  0
c  -3 does not represent an automaton state.
c    -( b^{1, 127}_2 ∧  b^{1, 127}_1 ∧  b^{1, 127}_0 ∧ true) 
c  in CNF:
c    -b^{1, 127}_2 ∨ -b^{1, 127}_1 ∨ -b^{1, 127}_0 ∨ false 
c  in DIMACS:
-1541 -1542 -1543  0

c i = 128
c  -2+1 --> -1
c    ( b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧  p_128) -> ( b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0)
c  in CNF:
c    -b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨  b^{1, 129}_2
c    -b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_1
c    -b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨  b^{1, 129}_0
c  in DIMACS:
-1544 -1545  1546 -128  1547 0
-1544 -1545  1546 -128 -1548 0
-1544 -1545  1546 -128  1549 0

c  -1+1 --> 0
c    ( b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0 ∧  p_128) -> (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧ -b^{1, 129}_0)
c  in CNF:
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_2
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_1
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_0
c  in DIMACS:
-1544  1545 -1546 -128 -1547 0
-1544  1545 -1546 -128 -1548 0
-1544  1545 -1546 -128 -1549 0

c  0+1 --> 1
c    (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧  p_128) -> (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0)
c  in CNF:
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_2
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_1
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨  b^{1, 129}_0
c  in DIMACS:
 1544  1545  1546 -128 -1547 0
 1544  1545  1546 -128 -1548 0
 1544  1545  1546 -128  1549 0

c  1+1 --> 2
c    (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0 ∧  p_128) -> (-b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0)
c  in CNF:
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_2
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨  b^{1, 129}_1
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ -p_128 ∨ -b^{1, 129}_0
c  in DIMACS:
 1544  1545 -1546 -128 -1547 0
 1544  1545 -1546 -128  1548 0
 1544  1545 -1546 -128 -1549 0

c  2+1 --> break 
c    (-b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧  p_128) -> break
c  in CNF:
c     b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 1544 -1545  1546 -128 1162 0


c  2-1 --> 1
c    (-b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧ -p_128) -> (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0)
c  in CNF:
c     b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_2
c     b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_1
c     b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨  b^{1, 129}_0
c  in DIMACS:
 1544 -1545  1546  128 -1547 0
 1544 -1545  1546  128 -1548 0
 1544 -1545  1546  128  1549 0

c  1-1 --> 0
c    (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0 ∧ -p_128) -> (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧ -b^{1, 129}_0)
c  in CNF:
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_2
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_1
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_0
c  in DIMACS:
 1544  1545 -1546  128 -1547 0
 1544  1545 -1546  128 -1548 0
 1544  1545 -1546  128 -1549 0

c  0-1 --> -1
c    (-b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧ -p_128) -> ( b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0)
c  in CNF:
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨  b^{1, 129}_2
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_1
c     b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨  b^{1, 129}_0
c  in DIMACS:
 1544  1545  1546  128  1547 0
 1544  1545  1546  128 -1548 0
 1544  1545  1546  128  1549 0

c  -1-1 --> -2
c    ( b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧  b^{1, 128}_0 ∧ -p_128) -> ( b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0)
c  in CNF:
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨  b^{1, 129}_2
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨  b^{1, 129}_1
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨  p_128 ∨ -b^{1, 129}_0
c  in DIMACS:
-1544  1545 -1546  128  1547 0
-1544  1545 -1546  128  1548 0
-1544  1545 -1546  128 -1549 0

c  -2-1 --> break 
c    ( b^{1, 128}_2 ∧  b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨  b^{1, 128}_0 ∨  p_128 ∨ break
c  in DIMACS:
-1544 -1545  1546  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 128}_2 ∧ -b^{1, 128}_1 ∧ -b^{1, 128}_0 ∧ true) 
c  in CNF:
c    -b^{1, 128}_2 ∨  b^{1, 128}_1 ∨  b^{1, 128}_0 ∨ false 
c  in DIMACS:
-1544  1545  1546  0

c  3 does not represent an automaton state.
c    -(-b^{1, 128}_2 ∧  b^{1, 128}_1 ∧  b^{1, 128}_0 ∧ true) 
c  in CNF:
c     b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ false 
c  in DIMACS:
 1544 -1545 -1546  0
c  -3 does not represent an automaton state.
c    -( b^{1, 128}_2 ∧  b^{1, 128}_1 ∧  b^{1, 128}_0 ∧ true) 
c  in CNF:
c    -b^{1, 128}_2 ∨ -b^{1, 128}_1 ∨ -b^{1, 128}_0 ∨ false 
c  in DIMACS:
-1544 -1545 -1546  0

c i = 129
c  -2+1 --> -1
c    ( b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧  p_129) -> ( b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0)
c  in CNF:
c    -b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨  b^{1, 130}_2
c    -b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_1
c    -b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨  b^{1, 130}_0
c  in DIMACS:
-1547 -1548  1549 -129  1550 0
-1547 -1548  1549 -129 -1551 0
-1547 -1548  1549 -129  1552 0

c  -1+1 --> 0
c    ( b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0 ∧  p_129) -> (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧ -b^{1, 130}_0)
c  in CNF:
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_2
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_1
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_0
c  in DIMACS:
-1547  1548 -1549 -129 -1550 0
-1547  1548 -1549 -129 -1551 0
-1547  1548 -1549 -129 -1552 0

c  0+1 --> 1
c    (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧  p_129) -> (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0)
c  in CNF:
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_2
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_1
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨  b^{1, 130}_0
c  in DIMACS:
 1547  1548  1549 -129 -1550 0
 1547  1548  1549 -129 -1551 0
 1547  1548  1549 -129  1552 0

c  1+1 --> 2
c    (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0 ∧  p_129) -> (-b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0)
c  in CNF:
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_2
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨  b^{1, 130}_1
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ -p_129 ∨ -b^{1, 130}_0
c  in DIMACS:
 1547  1548 -1549 -129 -1550 0
 1547  1548 -1549 -129  1551 0
 1547  1548 -1549 -129 -1552 0

c  2+1 --> break 
c    (-b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧  p_129) -> break
c  in CNF:
c     b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ -p_129 ∨ break
c  in DIMACS:
 1547 -1548  1549 -129 1162 0


c  2-1 --> 1
c    (-b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧ -p_129) -> (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0)
c  in CNF:
c     b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_2
c     b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_1
c     b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨  b^{1, 130}_0
c  in DIMACS:
 1547 -1548  1549  129 -1550 0
 1547 -1548  1549  129 -1551 0
 1547 -1548  1549  129  1552 0

c  1-1 --> 0
c    (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0 ∧ -p_129) -> (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧ -b^{1, 130}_0)
c  in CNF:
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_2
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_1
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_0
c  in DIMACS:
 1547  1548 -1549  129 -1550 0
 1547  1548 -1549  129 -1551 0
 1547  1548 -1549  129 -1552 0

c  0-1 --> -1
c    (-b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧ -p_129) -> ( b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0)
c  in CNF:
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨  b^{1, 130}_2
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_1
c     b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨  b^{1, 130}_0
c  in DIMACS:
 1547  1548  1549  129  1550 0
 1547  1548  1549  129 -1551 0
 1547  1548  1549  129  1552 0

c  -1-1 --> -2
c    ( b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧  b^{1, 129}_0 ∧ -p_129) -> ( b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0)
c  in CNF:
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨  b^{1, 130}_2
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨  b^{1, 130}_1
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨  p_129 ∨ -b^{1, 130}_0
c  in DIMACS:
-1547  1548 -1549  129  1550 0
-1547  1548 -1549  129  1551 0
-1547  1548 -1549  129 -1552 0

c  -2-1 --> break 
c    ( b^{1, 129}_2 ∧  b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧ -p_129) -> break
c  in CNF:
c    -b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨  b^{1, 129}_0 ∨  p_129 ∨ break
c  in DIMACS:
-1547 -1548  1549  129 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 129}_2 ∧ -b^{1, 129}_1 ∧ -b^{1, 129}_0 ∧ true) 
c  in CNF:
c    -b^{1, 129}_2 ∨  b^{1, 129}_1 ∨  b^{1, 129}_0 ∨ false 
c  in DIMACS:
-1547  1548  1549  0

c  3 does not represent an automaton state.
c    -(-b^{1, 129}_2 ∧  b^{1, 129}_1 ∧  b^{1, 129}_0 ∧ true) 
c  in CNF:
c     b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ false 
c  in DIMACS:
 1547 -1548 -1549  0
c  -3 does not represent an automaton state.
c    -( b^{1, 129}_2 ∧  b^{1, 129}_1 ∧  b^{1, 129}_0 ∧ true) 
c  in CNF:
c    -b^{1, 129}_2 ∨ -b^{1, 129}_1 ∨ -b^{1, 129}_0 ∨ false 
c  in DIMACS:
-1547 -1548 -1549  0

c i = 130
c  -2+1 --> -1
c    ( b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧  p_130) -> ( b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0)
c  in CNF:
c    -b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨  b^{1, 131}_2
c    -b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_1
c    -b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨  b^{1, 131}_0
c  in DIMACS:
-1550 -1551  1552 -130  1553 0
-1550 -1551  1552 -130 -1554 0
-1550 -1551  1552 -130  1555 0

c  -1+1 --> 0
c    ( b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0 ∧  p_130) -> (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧ -b^{1, 131}_0)
c  in CNF:
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_2
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_1
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_0
c  in DIMACS:
-1550  1551 -1552 -130 -1553 0
-1550  1551 -1552 -130 -1554 0
-1550  1551 -1552 -130 -1555 0

c  0+1 --> 1
c    (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧  p_130) -> (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0)
c  in CNF:
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_2
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_1
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨  b^{1, 131}_0
c  in DIMACS:
 1550  1551  1552 -130 -1553 0
 1550  1551  1552 -130 -1554 0
 1550  1551  1552 -130  1555 0

c  1+1 --> 2
c    (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0 ∧  p_130) -> (-b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0)
c  in CNF:
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_2
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨  b^{1, 131}_1
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ -p_130 ∨ -b^{1, 131}_0
c  in DIMACS:
 1550  1551 -1552 -130 -1553 0
 1550  1551 -1552 -130  1554 0
 1550  1551 -1552 -130 -1555 0

c  2+1 --> break 
c    (-b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧  p_130) -> break
c  in CNF:
c     b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 1550 -1551  1552 -130 1162 0


c  2-1 --> 1
c    (-b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧ -p_130) -> (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0)
c  in CNF:
c     b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_2
c     b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_1
c     b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨  b^{1, 131}_0
c  in DIMACS:
 1550 -1551  1552  130 -1553 0
 1550 -1551  1552  130 -1554 0
 1550 -1551  1552  130  1555 0

c  1-1 --> 0
c    (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0 ∧ -p_130) -> (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧ -b^{1, 131}_0)
c  in CNF:
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_2
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_1
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_0
c  in DIMACS:
 1550  1551 -1552  130 -1553 0
 1550  1551 -1552  130 -1554 0
 1550  1551 -1552  130 -1555 0

c  0-1 --> -1
c    (-b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧ -p_130) -> ( b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0)
c  in CNF:
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨  b^{1, 131}_2
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_1
c     b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨  b^{1, 131}_0
c  in DIMACS:
 1550  1551  1552  130  1553 0
 1550  1551  1552  130 -1554 0
 1550  1551  1552  130  1555 0

c  -1-1 --> -2
c    ( b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧  b^{1, 130}_0 ∧ -p_130) -> ( b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0)
c  in CNF:
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨  b^{1, 131}_2
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨  b^{1, 131}_1
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨  p_130 ∨ -b^{1, 131}_0
c  in DIMACS:
-1550  1551 -1552  130  1553 0
-1550  1551 -1552  130  1554 0
-1550  1551 -1552  130 -1555 0

c  -2-1 --> break 
c    ( b^{1, 130}_2 ∧  b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨  b^{1, 130}_0 ∨  p_130 ∨ break
c  in DIMACS:
-1550 -1551  1552  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 130}_2 ∧ -b^{1, 130}_1 ∧ -b^{1, 130}_0 ∧ true) 
c  in CNF:
c    -b^{1, 130}_2 ∨  b^{1, 130}_1 ∨  b^{1, 130}_0 ∨ false 
c  in DIMACS:
-1550  1551  1552  0

c  3 does not represent an automaton state.
c    -(-b^{1, 130}_2 ∧  b^{1, 130}_1 ∧  b^{1, 130}_0 ∧ true) 
c  in CNF:
c     b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ false 
c  in DIMACS:
 1550 -1551 -1552  0
c  -3 does not represent an automaton state.
c    -( b^{1, 130}_2 ∧  b^{1, 130}_1 ∧  b^{1, 130}_0 ∧ true) 
c  in CNF:
c    -b^{1, 130}_2 ∨ -b^{1, 130}_1 ∨ -b^{1, 130}_0 ∨ false 
c  in DIMACS:
-1550 -1551 -1552  0

c i = 131
c  -2+1 --> -1
c    ( b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧  p_131) -> ( b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0)
c  in CNF:
c    -b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨  b^{1, 132}_2
c    -b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_1
c    -b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨  b^{1, 132}_0
c  in DIMACS:
-1553 -1554  1555 -131  1556 0
-1553 -1554  1555 -131 -1557 0
-1553 -1554  1555 -131  1558 0

c  -1+1 --> 0
c    ( b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0 ∧  p_131) -> (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧ -b^{1, 132}_0)
c  in CNF:
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_2
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_1
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_0
c  in DIMACS:
-1553  1554 -1555 -131 -1556 0
-1553  1554 -1555 -131 -1557 0
-1553  1554 -1555 -131 -1558 0

c  0+1 --> 1
c    (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧  p_131) -> (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0)
c  in CNF:
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_2
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_1
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨  b^{1, 132}_0
c  in DIMACS:
 1553  1554  1555 -131 -1556 0
 1553  1554  1555 -131 -1557 0
 1553  1554  1555 -131  1558 0

c  1+1 --> 2
c    (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0 ∧  p_131) -> (-b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0)
c  in CNF:
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_2
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨  b^{1, 132}_1
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ -p_131 ∨ -b^{1, 132}_0
c  in DIMACS:
 1553  1554 -1555 -131 -1556 0
 1553  1554 -1555 -131  1557 0
 1553  1554 -1555 -131 -1558 0

c  2+1 --> break 
c    (-b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧  p_131) -> break
c  in CNF:
c     b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ -p_131 ∨ break
c  in DIMACS:
 1553 -1554  1555 -131 1162 0


c  2-1 --> 1
c    (-b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧ -p_131) -> (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0)
c  in CNF:
c     b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_2
c     b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_1
c     b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨  b^{1, 132}_0
c  in DIMACS:
 1553 -1554  1555  131 -1556 0
 1553 -1554  1555  131 -1557 0
 1553 -1554  1555  131  1558 0

c  1-1 --> 0
c    (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0 ∧ -p_131) -> (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧ -b^{1, 132}_0)
c  in CNF:
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_2
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_1
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_0
c  in DIMACS:
 1553  1554 -1555  131 -1556 0
 1553  1554 -1555  131 -1557 0
 1553  1554 -1555  131 -1558 0

c  0-1 --> -1
c    (-b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧ -p_131) -> ( b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0)
c  in CNF:
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨  b^{1, 132}_2
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_1
c     b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨  b^{1, 132}_0
c  in DIMACS:
 1553  1554  1555  131  1556 0
 1553  1554  1555  131 -1557 0
 1553  1554  1555  131  1558 0

c  -1-1 --> -2
c    ( b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧  b^{1, 131}_0 ∧ -p_131) -> ( b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0)
c  in CNF:
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨  b^{1, 132}_2
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨  b^{1, 132}_1
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨  p_131 ∨ -b^{1, 132}_0
c  in DIMACS:
-1553  1554 -1555  131  1556 0
-1553  1554 -1555  131  1557 0
-1553  1554 -1555  131 -1558 0

c  -2-1 --> break 
c    ( b^{1, 131}_2 ∧  b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧ -p_131) -> break
c  in CNF:
c    -b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨  b^{1, 131}_0 ∨  p_131 ∨ break
c  in DIMACS:
-1553 -1554  1555  131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 131}_2 ∧ -b^{1, 131}_1 ∧ -b^{1, 131}_0 ∧ true) 
c  in CNF:
c    -b^{1, 131}_2 ∨  b^{1, 131}_1 ∨  b^{1, 131}_0 ∨ false 
c  in DIMACS:
-1553  1554  1555  0

c  3 does not represent an automaton state.
c    -(-b^{1, 131}_2 ∧  b^{1, 131}_1 ∧  b^{1, 131}_0 ∧ true) 
c  in CNF:
c     b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ false 
c  in DIMACS:
 1553 -1554 -1555  0
c  -3 does not represent an automaton state.
c    -( b^{1, 131}_2 ∧  b^{1, 131}_1 ∧  b^{1, 131}_0 ∧ true) 
c  in CNF:
c    -b^{1, 131}_2 ∨ -b^{1, 131}_1 ∨ -b^{1, 131}_0 ∨ false 
c  in DIMACS:
-1553 -1554 -1555  0

c i = 132
c  -2+1 --> -1
c    ( b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧  p_132) -> ( b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0)
c  in CNF:
c    -b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨  b^{1, 133}_2
c    -b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_1
c    -b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨  b^{1, 133}_0
c  in DIMACS:
-1556 -1557  1558 -132  1559 0
-1556 -1557  1558 -132 -1560 0
-1556 -1557  1558 -132  1561 0

c  -1+1 --> 0
c    ( b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0 ∧  p_132) -> (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧ -b^{1, 133}_0)
c  in CNF:
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_2
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_1
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_0
c  in DIMACS:
-1556  1557 -1558 -132 -1559 0
-1556  1557 -1558 -132 -1560 0
-1556  1557 -1558 -132 -1561 0

c  0+1 --> 1
c    (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧  p_132) -> (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0)
c  in CNF:
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_2
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_1
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨  b^{1, 133}_0
c  in DIMACS:
 1556  1557  1558 -132 -1559 0
 1556  1557  1558 -132 -1560 0
 1556  1557  1558 -132  1561 0

c  1+1 --> 2
c    (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0 ∧  p_132) -> (-b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0)
c  in CNF:
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_2
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨  b^{1, 133}_1
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ -p_132 ∨ -b^{1, 133}_0
c  in DIMACS:
 1556  1557 -1558 -132 -1559 0
 1556  1557 -1558 -132  1560 0
 1556  1557 -1558 -132 -1561 0

c  2+1 --> break 
c    (-b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧  p_132) -> break
c  in CNF:
c     b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 1556 -1557  1558 -132 1162 0


c  2-1 --> 1
c    (-b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧ -p_132) -> (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0)
c  in CNF:
c     b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_2
c     b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_1
c     b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨  b^{1, 133}_0
c  in DIMACS:
 1556 -1557  1558  132 -1559 0
 1556 -1557  1558  132 -1560 0
 1556 -1557  1558  132  1561 0

c  1-1 --> 0
c    (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0 ∧ -p_132) -> (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧ -b^{1, 133}_0)
c  in CNF:
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_2
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_1
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_0
c  in DIMACS:
 1556  1557 -1558  132 -1559 0
 1556  1557 -1558  132 -1560 0
 1556  1557 -1558  132 -1561 0

c  0-1 --> -1
c    (-b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧ -p_132) -> ( b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0)
c  in CNF:
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨  b^{1, 133}_2
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_1
c     b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨  b^{1, 133}_0
c  in DIMACS:
 1556  1557  1558  132  1559 0
 1556  1557  1558  132 -1560 0
 1556  1557  1558  132  1561 0

c  -1-1 --> -2
c    ( b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧  b^{1, 132}_0 ∧ -p_132) -> ( b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0)
c  in CNF:
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨  b^{1, 133}_2
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨  b^{1, 133}_1
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨  p_132 ∨ -b^{1, 133}_0
c  in DIMACS:
-1556  1557 -1558  132  1559 0
-1556  1557 -1558  132  1560 0
-1556  1557 -1558  132 -1561 0

c  -2-1 --> break 
c    ( b^{1, 132}_2 ∧  b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨  b^{1, 132}_0 ∨  p_132 ∨ break
c  in DIMACS:
-1556 -1557  1558  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 132}_2 ∧ -b^{1, 132}_1 ∧ -b^{1, 132}_0 ∧ true) 
c  in CNF:
c    -b^{1, 132}_2 ∨  b^{1, 132}_1 ∨  b^{1, 132}_0 ∨ false 
c  in DIMACS:
-1556  1557  1558  0

c  3 does not represent an automaton state.
c    -(-b^{1, 132}_2 ∧  b^{1, 132}_1 ∧  b^{1, 132}_0 ∧ true) 
c  in CNF:
c     b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ false 
c  in DIMACS:
 1556 -1557 -1558  0
c  -3 does not represent an automaton state.
c    -( b^{1, 132}_2 ∧  b^{1, 132}_1 ∧  b^{1, 132}_0 ∧ true) 
c  in CNF:
c    -b^{1, 132}_2 ∨ -b^{1, 132}_1 ∨ -b^{1, 132}_0 ∨ false 
c  in DIMACS:
-1556 -1557 -1558  0

c i = 133
c  -2+1 --> -1
c    ( b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧  p_133) -> ( b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0)
c  in CNF:
c    -b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨  b^{1, 134}_2
c    -b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_1
c    -b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨  b^{1, 134}_0
c  in DIMACS:
-1559 -1560  1561 -133  1562 0
-1559 -1560  1561 -133 -1563 0
-1559 -1560  1561 -133  1564 0

c  -1+1 --> 0
c    ( b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0 ∧  p_133) -> (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧ -b^{1, 134}_0)
c  in CNF:
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_2
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_1
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_0
c  in DIMACS:
-1559  1560 -1561 -133 -1562 0
-1559  1560 -1561 -133 -1563 0
-1559  1560 -1561 -133 -1564 0

c  0+1 --> 1
c    (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧  p_133) -> (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0)
c  in CNF:
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_2
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_1
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨  b^{1, 134}_0
c  in DIMACS:
 1559  1560  1561 -133 -1562 0
 1559  1560  1561 -133 -1563 0
 1559  1560  1561 -133  1564 0

c  1+1 --> 2
c    (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0 ∧  p_133) -> (-b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0)
c  in CNF:
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_2
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨  b^{1, 134}_1
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ -p_133 ∨ -b^{1, 134}_0
c  in DIMACS:
 1559  1560 -1561 -133 -1562 0
 1559  1560 -1561 -133  1563 0
 1559  1560 -1561 -133 -1564 0

c  2+1 --> break 
c    (-b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧  p_133) -> break
c  in CNF:
c     b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ -p_133 ∨ break
c  in DIMACS:
 1559 -1560  1561 -133 1162 0


c  2-1 --> 1
c    (-b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧ -p_133) -> (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0)
c  in CNF:
c     b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_2
c     b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_1
c     b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨  b^{1, 134}_0
c  in DIMACS:
 1559 -1560  1561  133 -1562 0
 1559 -1560  1561  133 -1563 0
 1559 -1560  1561  133  1564 0

c  1-1 --> 0
c    (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0 ∧ -p_133) -> (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧ -b^{1, 134}_0)
c  in CNF:
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_2
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_1
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_0
c  in DIMACS:
 1559  1560 -1561  133 -1562 0
 1559  1560 -1561  133 -1563 0
 1559  1560 -1561  133 -1564 0

c  0-1 --> -1
c    (-b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧ -p_133) -> ( b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0)
c  in CNF:
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨  b^{1, 134}_2
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_1
c     b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨  b^{1, 134}_0
c  in DIMACS:
 1559  1560  1561  133  1562 0
 1559  1560  1561  133 -1563 0
 1559  1560  1561  133  1564 0

c  -1-1 --> -2
c    ( b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧  b^{1, 133}_0 ∧ -p_133) -> ( b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0)
c  in CNF:
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨  b^{1, 134}_2
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨  b^{1, 134}_1
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨  p_133 ∨ -b^{1, 134}_0
c  in DIMACS:
-1559  1560 -1561  133  1562 0
-1559  1560 -1561  133  1563 0
-1559  1560 -1561  133 -1564 0

c  -2-1 --> break 
c    ( b^{1, 133}_2 ∧  b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧ -p_133) -> break
c  in CNF:
c    -b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨  b^{1, 133}_0 ∨  p_133 ∨ break
c  in DIMACS:
-1559 -1560  1561  133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 133}_2 ∧ -b^{1, 133}_1 ∧ -b^{1, 133}_0 ∧ true) 
c  in CNF:
c    -b^{1, 133}_2 ∨  b^{1, 133}_1 ∨  b^{1, 133}_0 ∨ false 
c  in DIMACS:
-1559  1560  1561  0

c  3 does not represent an automaton state.
c    -(-b^{1, 133}_2 ∧  b^{1, 133}_1 ∧  b^{1, 133}_0 ∧ true) 
c  in CNF:
c     b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ false 
c  in DIMACS:
 1559 -1560 -1561  0
c  -3 does not represent an automaton state.
c    -( b^{1, 133}_2 ∧  b^{1, 133}_1 ∧  b^{1, 133}_0 ∧ true) 
c  in CNF:
c    -b^{1, 133}_2 ∨ -b^{1, 133}_1 ∨ -b^{1, 133}_0 ∨ false 
c  in DIMACS:
-1559 -1560 -1561  0

c i = 134
c  -2+1 --> -1
c    ( b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧  p_134) -> ( b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0)
c  in CNF:
c    -b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨  b^{1, 135}_2
c    -b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_1
c    -b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨  b^{1, 135}_0
c  in DIMACS:
-1562 -1563  1564 -134  1565 0
-1562 -1563  1564 -134 -1566 0
-1562 -1563  1564 -134  1567 0

c  -1+1 --> 0
c    ( b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0 ∧  p_134) -> (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧ -b^{1, 135}_0)
c  in CNF:
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_2
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_1
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_0
c  in DIMACS:
-1562  1563 -1564 -134 -1565 0
-1562  1563 -1564 -134 -1566 0
-1562  1563 -1564 -134 -1567 0

c  0+1 --> 1
c    (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧  p_134) -> (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0)
c  in CNF:
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_2
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_1
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨  b^{1, 135}_0
c  in DIMACS:
 1562  1563  1564 -134 -1565 0
 1562  1563  1564 -134 -1566 0
 1562  1563  1564 -134  1567 0

c  1+1 --> 2
c    (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0 ∧  p_134) -> (-b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0)
c  in CNF:
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_2
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨  b^{1, 135}_1
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ -p_134 ∨ -b^{1, 135}_0
c  in DIMACS:
 1562  1563 -1564 -134 -1565 0
 1562  1563 -1564 -134  1566 0
 1562  1563 -1564 -134 -1567 0

c  2+1 --> break 
c    (-b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧  p_134) -> break
c  in CNF:
c     b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ -p_134 ∨ break
c  in DIMACS:
 1562 -1563  1564 -134 1162 0


c  2-1 --> 1
c    (-b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧ -p_134) -> (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0)
c  in CNF:
c     b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_2
c     b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_1
c     b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨  b^{1, 135}_0
c  in DIMACS:
 1562 -1563  1564  134 -1565 0
 1562 -1563  1564  134 -1566 0
 1562 -1563  1564  134  1567 0

c  1-1 --> 0
c    (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0 ∧ -p_134) -> (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧ -b^{1, 135}_0)
c  in CNF:
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_2
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_1
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_0
c  in DIMACS:
 1562  1563 -1564  134 -1565 0
 1562  1563 -1564  134 -1566 0
 1562  1563 -1564  134 -1567 0

c  0-1 --> -1
c    (-b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧ -p_134) -> ( b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0)
c  in CNF:
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨  b^{1, 135}_2
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_1
c     b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨  b^{1, 135}_0
c  in DIMACS:
 1562  1563  1564  134  1565 0
 1562  1563  1564  134 -1566 0
 1562  1563  1564  134  1567 0

c  -1-1 --> -2
c    ( b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧  b^{1, 134}_0 ∧ -p_134) -> ( b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0)
c  in CNF:
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨  b^{1, 135}_2
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨  b^{1, 135}_1
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨  p_134 ∨ -b^{1, 135}_0
c  in DIMACS:
-1562  1563 -1564  134  1565 0
-1562  1563 -1564  134  1566 0
-1562  1563 -1564  134 -1567 0

c  -2-1 --> break 
c    ( b^{1, 134}_2 ∧  b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧ -p_134) -> break
c  in CNF:
c    -b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨  b^{1, 134}_0 ∨  p_134 ∨ break
c  in DIMACS:
-1562 -1563  1564  134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 134}_2 ∧ -b^{1, 134}_1 ∧ -b^{1, 134}_0 ∧ true) 
c  in CNF:
c    -b^{1, 134}_2 ∨  b^{1, 134}_1 ∨  b^{1, 134}_0 ∨ false 
c  in DIMACS:
-1562  1563  1564  0

c  3 does not represent an automaton state.
c    -(-b^{1, 134}_2 ∧  b^{1, 134}_1 ∧  b^{1, 134}_0 ∧ true) 
c  in CNF:
c     b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ false 
c  in DIMACS:
 1562 -1563 -1564  0
c  -3 does not represent an automaton state.
c    -( b^{1, 134}_2 ∧  b^{1, 134}_1 ∧  b^{1, 134}_0 ∧ true) 
c  in CNF:
c    -b^{1, 134}_2 ∨ -b^{1, 134}_1 ∨ -b^{1, 134}_0 ∨ false 
c  in DIMACS:
-1562 -1563 -1564  0

c i = 135
c  -2+1 --> -1
c    ( b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧  p_135) -> ( b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0)
c  in CNF:
c    -b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨  b^{1, 136}_2
c    -b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_1
c    -b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨  b^{1, 136}_0
c  in DIMACS:
-1565 -1566  1567 -135  1568 0
-1565 -1566  1567 -135 -1569 0
-1565 -1566  1567 -135  1570 0

c  -1+1 --> 0
c    ( b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0 ∧  p_135) -> (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧ -b^{1, 136}_0)
c  in CNF:
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_2
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_1
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_0
c  in DIMACS:
-1565  1566 -1567 -135 -1568 0
-1565  1566 -1567 -135 -1569 0
-1565  1566 -1567 -135 -1570 0

c  0+1 --> 1
c    (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧  p_135) -> (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0)
c  in CNF:
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_2
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_1
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨  b^{1, 136}_0
c  in DIMACS:
 1565  1566  1567 -135 -1568 0
 1565  1566  1567 -135 -1569 0
 1565  1566  1567 -135  1570 0

c  1+1 --> 2
c    (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0 ∧  p_135) -> (-b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0)
c  in CNF:
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_2
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨  b^{1, 136}_1
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ -p_135 ∨ -b^{1, 136}_0
c  in DIMACS:
 1565  1566 -1567 -135 -1568 0
 1565  1566 -1567 -135  1569 0
 1565  1566 -1567 -135 -1570 0

c  2+1 --> break 
c    (-b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧  p_135) -> break
c  in CNF:
c     b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 1565 -1566  1567 -135 1162 0


c  2-1 --> 1
c    (-b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧ -p_135) -> (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0)
c  in CNF:
c     b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_2
c     b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_1
c     b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨  b^{1, 136}_0
c  in DIMACS:
 1565 -1566  1567  135 -1568 0
 1565 -1566  1567  135 -1569 0
 1565 -1566  1567  135  1570 0

c  1-1 --> 0
c    (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0 ∧ -p_135) -> (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧ -b^{1, 136}_0)
c  in CNF:
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_2
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_1
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_0
c  in DIMACS:
 1565  1566 -1567  135 -1568 0
 1565  1566 -1567  135 -1569 0
 1565  1566 -1567  135 -1570 0

c  0-1 --> -1
c    (-b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧ -p_135) -> ( b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0)
c  in CNF:
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨  b^{1, 136}_2
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_1
c     b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨  b^{1, 136}_0
c  in DIMACS:
 1565  1566  1567  135  1568 0
 1565  1566  1567  135 -1569 0
 1565  1566  1567  135  1570 0

c  -1-1 --> -2
c    ( b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧  b^{1, 135}_0 ∧ -p_135) -> ( b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0)
c  in CNF:
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨  b^{1, 136}_2
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨  b^{1, 136}_1
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨  p_135 ∨ -b^{1, 136}_0
c  in DIMACS:
-1565  1566 -1567  135  1568 0
-1565  1566 -1567  135  1569 0
-1565  1566 -1567  135 -1570 0

c  -2-1 --> break 
c    ( b^{1, 135}_2 ∧  b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨  b^{1, 135}_0 ∨  p_135 ∨ break
c  in DIMACS:
-1565 -1566  1567  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 135}_2 ∧ -b^{1, 135}_1 ∧ -b^{1, 135}_0 ∧ true) 
c  in CNF:
c    -b^{1, 135}_2 ∨  b^{1, 135}_1 ∨  b^{1, 135}_0 ∨ false 
c  in DIMACS:
-1565  1566  1567  0

c  3 does not represent an automaton state.
c    -(-b^{1, 135}_2 ∧  b^{1, 135}_1 ∧  b^{1, 135}_0 ∧ true) 
c  in CNF:
c     b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ false 
c  in DIMACS:
 1565 -1566 -1567  0
c  -3 does not represent an automaton state.
c    -( b^{1, 135}_2 ∧  b^{1, 135}_1 ∧  b^{1, 135}_0 ∧ true) 
c  in CNF:
c    -b^{1, 135}_2 ∨ -b^{1, 135}_1 ∨ -b^{1, 135}_0 ∨ false 
c  in DIMACS:
-1565 -1566 -1567  0

c i = 136
c  -2+1 --> -1
c    ( b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧  p_136) -> ( b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0)
c  in CNF:
c    -b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨  b^{1, 137}_2
c    -b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_1
c    -b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨  b^{1, 137}_0
c  in DIMACS:
-1568 -1569  1570 -136  1571 0
-1568 -1569  1570 -136 -1572 0
-1568 -1569  1570 -136  1573 0

c  -1+1 --> 0
c    ( b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0 ∧  p_136) -> (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧ -b^{1, 137}_0)
c  in CNF:
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_2
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_1
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_0
c  in DIMACS:
-1568  1569 -1570 -136 -1571 0
-1568  1569 -1570 -136 -1572 0
-1568  1569 -1570 -136 -1573 0

c  0+1 --> 1
c    (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧  p_136) -> (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0)
c  in CNF:
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_2
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_1
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨  b^{1, 137}_0
c  in DIMACS:
 1568  1569  1570 -136 -1571 0
 1568  1569  1570 -136 -1572 0
 1568  1569  1570 -136  1573 0

c  1+1 --> 2
c    (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0 ∧  p_136) -> (-b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0)
c  in CNF:
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_2
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨  b^{1, 137}_1
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ -p_136 ∨ -b^{1, 137}_0
c  in DIMACS:
 1568  1569 -1570 -136 -1571 0
 1568  1569 -1570 -136  1572 0
 1568  1569 -1570 -136 -1573 0

c  2+1 --> break 
c    (-b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧  p_136) -> break
c  in CNF:
c     b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 1568 -1569  1570 -136 1162 0


c  2-1 --> 1
c    (-b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧ -p_136) -> (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0)
c  in CNF:
c     b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_2
c     b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_1
c     b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨  b^{1, 137}_0
c  in DIMACS:
 1568 -1569  1570  136 -1571 0
 1568 -1569  1570  136 -1572 0
 1568 -1569  1570  136  1573 0

c  1-1 --> 0
c    (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0 ∧ -p_136) -> (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧ -b^{1, 137}_0)
c  in CNF:
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_2
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_1
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_0
c  in DIMACS:
 1568  1569 -1570  136 -1571 0
 1568  1569 -1570  136 -1572 0
 1568  1569 -1570  136 -1573 0

c  0-1 --> -1
c    (-b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧ -p_136) -> ( b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0)
c  in CNF:
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨  b^{1, 137}_2
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_1
c     b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨  b^{1, 137}_0
c  in DIMACS:
 1568  1569  1570  136  1571 0
 1568  1569  1570  136 -1572 0
 1568  1569  1570  136  1573 0

c  -1-1 --> -2
c    ( b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧  b^{1, 136}_0 ∧ -p_136) -> ( b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0)
c  in CNF:
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨  b^{1, 137}_2
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨  b^{1, 137}_1
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨  p_136 ∨ -b^{1, 137}_0
c  in DIMACS:
-1568  1569 -1570  136  1571 0
-1568  1569 -1570  136  1572 0
-1568  1569 -1570  136 -1573 0

c  -2-1 --> break 
c    ( b^{1, 136}_2 ∧  b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨  b^{1, 136}_0 ∨  p_136 ∨ break
c  in DIMACS:
-1568 -1569  1570  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 136}_2 ∧ -b^{1, 136}_1 ∧ -b^{1, 136}_0 ∧ true) 
c  in CNF:
c    -b^{1, 136}_2 ∨  b^{1, 136}_1 ∨  b^{1, 136}_0 ∨ false 
c  in DIMACS:
-1568  1569  1570  0

c  3 does not represent an automaton state.
c    -(-b^{1, 136}_2 ∧  b^{1, 136}_1 ∧  b^{1, 136}_0 ∧ true) 
c  in CNF:
c     b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ false 
c  in DIMACS:
 1568 -1569 -1570  0
c  -3 does not represent an automaton state.
c    -( b^{1, 136}_2 ∧  b^{1, 136}_1 ∧  b^{1, 136}_0 ∧ true) 
c  in CNF:
c    -b^{1, 136}_2 ∨ -b^{1, 136}_1 ∨ -b^{1, 136}_0 ∨ false 
c  in DIMACS:
-1568 -1569 -1570  0

c i = 137
c  -2+1 --> -1
c    ( b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧  p_137) -> ( b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0)
c  in CNF:
c    -b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨  b^{1, 138}_2
c    -b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_1
c    -b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨  b^{1, 138}_0
c  in DIMACS:
-1571 -1572  1573 -137  1574 0
-1571 -1572  1573 -137 -1575 0
-1571 -1572  1573 -137  1576 0

c  -1+1 --> 0
c    ( b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0 ∧  p_137) -> (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧ -b^{1, 138}_0)
c  in CNF:
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_2
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_1
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_0
c  in DIMACS:
-1571  1572 -1573 -137 -1574 0
-1571  1572 -1573 -137 -1575 0
-1571  1572 -1573 -137 -1576 0

c  0+1 --> 1
c    (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧  p_137) -> (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0)
c  in CNF:
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_2
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_1
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨  b^{1, 138}_0
c  in DIMACS:
 1571  1572  1573 -137 -1574 0
 1571  1572  1573 -137 -1575 0
 1571  1572  1573 -137  1576 0

c  1+1 --> 2
c    (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0 ∧  p_137) -> (-b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0)
c  in CNF:
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_2
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨  b^{1, 138}_1
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ -p_137 ∨ -b^{1, 138}_0
c  in DIMACS:
 1571  1572 -1573 -137 -1574 0
 1571  1572 -1573 -137  1575 0
 1571  1572 -1573 -137 -1576 0

c  2+1 --> break 
c    (-b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧  p_137) -> break
c  in CNF:
c     b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ -p_137 ∨ break
c  in DIMACS:
 1571 -1572  1573 -137 1162 0


c  2-1 --> 1
c    (-b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧ -p_137) -> (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0)
c  in CNF:
c     b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_2
c     b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_1
c     b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨  b^{1, 138}_0
c  in DIMACS:
 1571 -1572  1573  137 -1574 0
 1571 -1572  1573  137 -1575 0
 1571 -1572  1573  137  1576 0

c  1-1 --> 0
c    (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0 ∧ -p_137) -> (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧ -b^{1, 138}_0)
c  in CNF:
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_2
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_1
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_0
c  in DIMACS:
 1571  1572 -1573  137 -1574 0
 1571  1572 -1573  137 -1575 0
 1571  1572 -1573  137 -1576 0

c  0-1 --> -1
c    (-b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧ -p_137) -> ( b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0)
c  in CNF:
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨  b^{1, 138}_2
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_1
c     b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨  b^{1, 138}_0
c  in DIMACS:
 1571  1572  1573  137  1574 0
 1571  1572  1573  137 -1575 0
 1571  1572  1573  137  1576 0

c  -1-1 --> -2
c    ( b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧  b^{1, 137}_0 ∧ -p_137) -> ( b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0)
c  in CNF:
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨  b^{1, 138}_2
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨  b^{1, 138}_1
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨  p_137 ∨ -b^{1, 138}_0
c  in DIMACS:
-1571  1572 -1573  137  1574 0
-1571  1572 -1573  137  1575 0
-1571  1572 -1573  137 -1576 0

c  -2-1 --> break 
c    ( b^{1, 137}_2 ∧  b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧ -p_137) -> break
c  in CNF:
c    -b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨  b^{1, 137}_0 ∨  p_137 ∨ break
c  in DIMACS:
-1571 -1572  1573  137 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 137}_2 ∧ -b^{1, 137}_1 ∧ -b^{1, 137}_0 ∧ true) 
c  in CNF:
c    -b^{1, 137}_2 ∨  b^{1, 137}_1 ∨  b^{1, 137}_0 ∨ false 
c  in DIMACS:
-1571  1572  1573  0

c  3 does not represent an automaton state.
c    -(-b^{1, 137}_2 ∧  b^{1, 137}_1 ∧  b^{1, 137}_0 ∧ true) 
c  in CNF:
c     b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ false 
c  in DIMACS:
 1571 -1572 -1573  0
c  -3 does not represent an automaton state.
c    -( b^{1, 137}_2 ∧  b^{1, 137}_1 ∧  b^{1, 137}_0 ∧ true) 
c  in CNF:
c    -b^{1, 137}_2 ∨ -b^{1, 137}_1 ∨ -b^{1, 137}_0 ∨ false 
c  in DIMACS:
-1571 -1572 -1573  0

c i = 138
c  -2+1 --> -1
c    ( b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧  p_138) -> ( b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0)
c  in CNF:
c    -b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨  b^{1, 139}_2
c    -b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_1
c    -b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨  b^{1, 139}_0
c  in DIMACS:
-1574 -1575  1576 -138  1577 0
-1574 -1575  1576 -138 -1578 0
-1574 -1575  1576 -138  1579 0

c  -1+1 --> 0
c    ( b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0 ∧  p_138) -> (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧ -b^{1, 139}_0)
c  in CNF:
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_2
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_1
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_0
c  in DIMACS:
-1574  1575 -1576 -138 -1577 0
-1574  1575 -1576 -138 -1578 0
-1574  1575 -1576 -138 -1579 0

c  0+1 --> 1
c    (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧  p_138) -> (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0)
c  in CNF:
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_2
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_1
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨  b^{1, 139}_0
c  in DIMACS:
 1574  1575  1576 -138 -1577 0
 1574  1575  1576 -138 -1578 0
 1574  1575  1576 -138  1579 0

c  1+1 --> 2
c    (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0 ∧  p_138) -> (-b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0)
c  in CNF:
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_2
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨  b^{1, 139}_1
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ -p_138 ∨ -b^{1, 139}_0
c  in DIMACS:
 1574  1575 -1576 -138 -1577 0
 1574  1575 -1576 -138  1578 0
 1574  1575 -1576 -138 -1579 0

c  2+1 --> break 
c    (-b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧  p_138) -> break
c  in CNF:
c     b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 1574 -1575  1576 -138 1162 0


c  2-1 --> 1
c    (-b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧ -p_138) -> (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0)
c  in CNF:
c     b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_2
c     b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_1
c     b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨  b^{1, 139}_0
c  in DIMACS:
 1574 -1575  1576  138 -1577 0
 1574 -1575  1576  138 -1578 0
 1574 -1575  1576  138  1579 0

c  1-1 --> 0
c    (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0 ∧ -p_138) -> (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧ -b^{1, 139}_0)
c  in CNF:
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_2
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_1
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_0
c  in DIMACS:
 1574  1575 -1576  138 -1577 0
 1574  1575 -1576  138 -1578 0
 1574  1575 -1576  138 -1579 0

c  0-1 --> -1
c    (-b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧ -p_138) -> ( b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0)
c  in CNF:
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨  b^{1, 139}_2
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_1
c     b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨  b^{1, 139}_0
c  in DIMACS:
 1574  1575  1576  138  1577 0
 1574  1575  1576  138 -1578 0
 1574  1575  1576  138  1579 0

c  -1-1 --> -2
c    ( b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧  b^{1, 138}_0 ∧ -p_138) -> ( b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0)
c  in CNF:
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨  b^{1, 139}_2
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨  b^{1, 139}_1
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨  p_138 ∨ -b^{1, 139}_0
c  in DIMACS:
-1574  1575 -1576  138  1577 0
-1574  1575 -1576  138  1578 0
-1574  1575 -1576  138 -1579 0

c  -2-1 --> break 
c    ( b^{1, 138}_2 ∧  b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨  b^{1, 138}_0 ∨  p_138 ∨ break
c  in DIMACS:
-1574 -1575  1576  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 138}_2 ∧ -b^{1, 138}_1 ∧ -b^{1, 138}_0 ∧ true) 
c  in CNF:
c    -b^{1, 138}_2 ∨  b^{1, 138}_1 ∨  b^{1, 138}_0 ∨ false 
c  in DIMACS:
-1574  1575  1576  0

c  3 does not represent an automaton state.
c    -(-b^{1, 138}_2 ∧  b^{1, 138}_1 ∧  b^{1, 138}_0 ∧ true) 
c  in CNF:
c     b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ false 
c  in DIMACS:
 1574 -1575 -1576  0
c  -3 does not represent an automaton state.
c    -( b^{1, 138}_2 ∧  b^{1, 138}_1 ∧  b^{1, 138}_0 ∧ true) 
c  in CNF:
c    -b^{1, 138}_2 ∨ -b^{1, 138}_1 ∨ -b^{1, 138}_0 ∨ false 
c  in DIMACS:
-1574 -1575 -1576  0

c i = 139
c  -2+1 --> -1
c    ( b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧  p_139) -> ( b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0)
c  in CNF:
c    -b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨  b^{1, 140}_2
c    -b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_1
c    -b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨  b^{1, 140}_0
c  in DIMACS:
-1577 -1578  1579 -139  1580 0
-1577 -1578  1579 -139 -1581 0
-1577 -1578  1579 -139  1582 0

c  -1+1 --> 0
c    ( b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0 ∧  p_139) -> (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧ -b^{1, 140}_0)
c  in CNF:
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_2
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_1
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_0
c  in DIMACS:
-1577  1578 -1579 -139 -1580 0
-1577  1578 -1579 -139 -1581 0
-1577  1578 -1579 -139 -1582 0

c  0+1 --> 1
c    (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧  p_139) -> (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0)
c  in CNF:
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_2
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_1
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨  b^{1, 140}_0
c  in DIMACS:
 1577  1578  1579 -139 -1580 0
 1577  1578  1579 -139 -1581 0
 1577  1578  1579 -139  1582 0

c  1+1 --> 2
c    (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0 ∧  p_139) -> (-b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0)
c  in CNF:
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_2
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨  b^{1, 140}_1
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ -p_139 ∨ -b^{1, 140}_0
c  in DIMACS:
 1577  1578 -1579 -139 -1580 0
 1577  1578 -1579 -139  1581 0
 1577  1578 -1579 -139 -1582 0

c  2+1 --> break 
c    (-b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧  p_139) -> break
c  in CNF:
c     b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ -p_139 ∨ break
c  in DIMACS:
 1577 -1578  1579 -139 1162 0


c  2-1 --> 1
c    (-b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧ -p_139) -> (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0)
c  in CNF:
c     b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_2
c     b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_1
c     b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨  b^{1, 140}_0
c  in DIMACS:
 1577 -1578  1579  139 -1580 0
 1577 -1578  1579  139 -1581 0
 1577 -1578  1579  139  1582 0

c  1-1 --> 0
c    (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0 ∧ -p_139) -> (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧ -b^{1, 140}_0)
c  in CNF:
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_2
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_1
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_0
c  in DIMACS:
 1577  1578 -1579  139 -1580 0
 1577  1578 -1579  139 -1581 0
 1577  1578 -1579  139 -1582 0

c  0-1 --> -1
c    (-b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧ -p_139) -> ( b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0)
c  in CNF:
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨  b^{1, 140}_2
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_1
c     b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨  b^{1, 140}_0
c  in DIMACS:
 1577  1578  1579  139  1580 0
 1577  1578  1579  139 -1581 0
 1577  1578  1579  139  1582 0

c  -1-1 --> -2
c    ( b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧  b^{1, 139}_0 ∧ -p_139) -> ( b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0)
c  in CNF:
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨  b^{1, 140}_2
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨  b^{1, 140}_1
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨  p_139 ∨ -b^{1, 140}_0
c  in DIMACS:
-1577  1578 -1579  139  1580 0
-1577  1578 -1579  139  1581 0
-1577  1578 -1579  139 -1582 0

c  -2-1 --> break 
c    ( b^{1, 139}_2 ∧  b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧ -p_139) -> break
c  in CNF:
c    -b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨  b^{1, 139}_0 ∨  p_139 ∨ break
c  in DIMACS:
-1577 -1578  1579  139 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 139}_2 ∧ -b^{1, 139}_1 ∧ -b^{1, 139}_0 ∧ true) 
c  in CNF:
c    -b^{1, 139}_2 ∨  b^{1, 139}_1 ∨  b^{1, 139}_0 ∨ false 
c  in DIMACS:
-1577  1578  1579  0

c  3 does not represent an automaton state.
c    -(-b^{1, 139}_2 ∧  b^{1, 139}_1 ∧  b^{1, 139}_0 ∧ true) 
c  in CNF:
c     b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ false 
c  in DIMACS:
 1577 -1578 -1579  0
c  -3 does not represent an automaton state.
c    -( b^{1, 139}_2 ∧  b^{1, 139}_1 ∧  b^{1, 139}_0 ∧ true) 
c  in CNF:
c    -b^{1, 139}_2 ∨ -b^{1, 139}_1 ∨ -b^{1, 139}_0 ∨ false 
c  in DIMACS:
-1577 -1578 -1579  0

c i = 140
c  -2+1 --> -1
c    ( b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧  p_140) -> ( b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0)
c  in CNF:
c    -b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨  b^{1, 141}_2
c    -b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_1
c    -b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨  b^{1, 141}_0
c  in DIMACS:
-1580 -1581  1582 -140  1583 0
-1580 -1581  1582 -140 -1584 0
-1580 -1581  1582 -140  1585 0

c  -1+1 --> 0
c    ( b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0 ∧  p_140) -> (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧ -b^{1, 141}_0)
c  in CNF:
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_2
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_1
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_0
c  in DIMACS:
-1580  1581 -1582 -140 -1583 0
-1580  1581 -1582 -140 -1584 0
-1580  1581 -1582 -140 -1585 0

c  0+1 --> 1
c    (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧  p_140) -> (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0)
c  in CNF:
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_2
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_1
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨  b^{1, 141}_0
c  in DIMACS:
 1580  1581  1582 -140 -1583 0
 1580  1581  1582 -140 -1584 0
 1580  1581  1582 -140  1585 0

c  1+1 --> 2
c    (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0 ∧  p_140) -> (-b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0)
c  in CNF:
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_2
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨  b^{1, 141}_1
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ -p_140 ∨ -b^{1, 141}_0
c  in DIMACS:
 1580  1581 -1582 -140 -1583 0
 1580  1581 -1582 -140  1584 0
 1580  1581 -1582 -140 -1585 0

c  2+1 --> break 
c    (-b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧  p_140) -> break
c  in CNF:
c     b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 1580 -1581  1582 -140 1162 0


c  2-1 --> 1
c    (-b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧ -p_140) -> (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0)
c  in CNF:
c     b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_2
c     b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_1
c     b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨  b^{1, 141}_0
c  in DIMACS:
 1580 -1581  1582  140 -1583 0
 1580 -1581  1582  140 -1584 0
 1580 -1581  1582  140  1585 0

c  1-1 --> 0
c    (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0 ∧ -p_140) -> (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧ -b^{1, 141}_0)
c  in CNF:
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_2
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_1
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_0
c  in DIMACS:
 1580  1581 -1582  140 -1583 0
 1580  1581 -1582  140 -1584 0
 1580  1581 -1582  140 -1585 0

c  0-1 --> -1
c    (-b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧ -p_140) -> ( b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0)
c  in CNF:
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨  b^{1, 141}_2
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_1
c     b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨  b^{1, 141}_0
c  in DIMACS:
 1580  1581  1582  140  1583 0
 1580  1581  1582  140 -1584 0
 1580  1581  1582  140  1585 0

c  -1-1 --> -2
c    ( b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧  b^{1, 140}_0 ∧ -p_140) -> ( b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0)
c  in CNF:
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨  b^{1, 141}_2
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨  b^{1, 141}_1
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨  p_140 ∨ -b^{1, 141}_0
c  in DIMACS:
-1580  1581 -1582  140  1583 0
-1580  1581 -1582  140  1584 0
-1580  1581 -1582  140 -1585 0

c  -2-1 --> break 
c    ( b^{1, 140}_2 ∧  b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨  b^{1, 140}_0 ∨  p_140 ∨ break
c  in DIMACS:
-1580 -1581  1582  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 140}_2 ∧ -b^{1, 140}_1 ∧ -b^{1, 140}_0 ∧ true) 
c  in CNF:
c    -b^{1, 140}_2 ∨  b^{1, 140}_1 ∨  b^{1, 140}_0 ∨ false 
c  in DIMACS:
-1580  1581  1582  0

c  3 does not represent an automaton state.
c    -(-b^{1, 140}_2 ∧  b^{1, 140}_1 ∧  b^{1, 140}_0 ∧ true) 
c  in CNF:
c     b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ false 
c  in DIMACS:
 1580 -1581 -1582  0
c  -3 does not represent an automaton state.
c    -( b^{1, 140}_2 ∧  b^{1, 140}_1 ∧  b^{1, 140}_0 ∧ true) 
c  in CNF:
c    -b^{1, 140}_2 ∨ -b^{1, 140}_1 ∨ -b^{1, 140}_0 ∨ false 
c  in DIMACS:
-1580 -1581 -1582  0

c i = 141
c  -2+1 --> -1
c    ( b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧  p_141) -> ( b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0)
c  in CNF:
c    -b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨  b^{1, 142}_2
c    -b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_1
c    -b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨  b^{1, 142}_0
c  in DIMACS:
-1583 -1584  1585 -141  1586 0
-1583 -1584  1585 -141 -1587 0
-1583 -1584  1585 -141  1588 0

c  -1+1 --> 0
c    ( b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0 ∧  p_141) -> (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧ -b^{1, 142}_0)
c  in CNF:
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_2
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_1
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_0
c  in DIMACS:
-1583  1584 -1585 -141 -1586 0
-1583  1584 -1585 -141 -1587 0
-1583  1584 -1585 -141 -1588 0

c  0+1 --> 1
c    (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧  p_141) -> (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0)
c  in CNF:
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_2
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_1
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨  b^{1, 142}_0
c  in DIMACS:
 1583  1584  1585 -141 -1586 0
 1583  1584  1585 -141 -1587 0
 1583  1584  1585 -141  1588 0

c  1+1 --> 2
c    (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0 ∧  p_141) -> (-b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0)
c  in CNF:
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_2
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨  b^{1, 142}_1
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ -p_141 ∨ -b^{1, 142}_0
c  in DIMACS:
 1583  1584 -1585 -141 -1586 0
 1583  1584 -1585 -141  1587 0
 1583  1584 -1585 -141 -1588 0

c  2+1 --> break 
c    (-b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧  p_141) -> break
c  in CNF:
c     b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ -p_141 ∨ break
c  in DIMACS:
 1583 -1584  1585 -141 1162 0


c  2-1 --> 1
c    (-b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧ -p_141) -> (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0)
c  in CNF:
c     b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_2
c     b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_1
c     b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨  b^{1, 142}_0
c  in DIMACS:
 1583 -1584  1585  141 -1586 0
 1583 -1584  1585  141 -1587 0
 1583 -1584  1585  141  1588 0

c  1-1 --> 0
c    (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0 ∧ -p_141) -> (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧ -b^{1, 142}_0)
c  in CNF:
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_2
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_1
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_0
c  in DIMACS:
 1583  1584 -1585  141 -1586 0
 1583  1584 -1585  141 -1587 0
 1583  1584 -1585  141 -1588 0

c  0-1 --> -1
c    (-b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧ -p_141) -> ( b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0)
c  in CNF:
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨  b^{1, 142}_2
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_1
c     b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨  b^{1, 142}_0
c  in DIMACS:
 1583  1584  1585  141  1586 0
 1583  1584  1585  141 -1587 0
 1583  1584  1585  141  1588 0

c  -1-1 --> -2
c    ( b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧  b^{1, 141}_0 ∧ -p_141) -> ( b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0)
c  in CNF:
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨  b^{1, 142}_2
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨  b^{1, 142}_1
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨  p_141 ∨ -b^{1, 142}_0
c  in DIMACS:
-1583  1584 -1585  141  1586 0
-1583  1584 -1585  141  1587 0
-1583  1584 -1585  141 -1588 0

c  -2-1 --> break 
c    ( b^{1, 141}_2 ∧  b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧ -p_141) -> break
c  in CNF:
c    -b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨  b^{1, 141}_0 ∨  p_141 ∨ break
c  in DIMACS:
-1583 -1584  1585  141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 141}_2 ∧ -b^{1, 141}_1 ∧ -b^{1, 141}_0 ∧ true) 
c  in CNF:
c    -b^{1, 141}_2 ∨  b^{1, 141}_1 ∨  b^{1, 141}_0 ∨ false 
c  in DIMACS:
-1583  1584  1585  0

c  3 does not represent an automaton state.
c    -(-b^{1, 141}_2 ∧  b^{1, 141}_1 ∧  b^{1, 141}_0 ∧ true) 
c  in CNF:
c     b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ false 
c  in DIMACS:
 1583 -1584 -1585  0
c  -3 does not represent an automaton state.
c    -( b^{1, 141}_2 ∧  b^{1, 141}_1 ∧  b^{1, 141}_0 ∧ true) 
c  in CNF:
c    -b^{1, 141}_2 ∨ -b^{1, 141}_1 ∨ -b^{1, 141}_0 ∨ false 
c  in DIMACS:
-1583 -1584 -1585  0

c i = 142
c  -2+1 --> -1
c    ( b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧  p_142) -> ( b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0)
c  in CNF:
c    -b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨  b^{1, 143}_2
c    -b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_1
c    -b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨  b^{1, 143}_0
c  in DIMACS:
-1586 -1587  1588 -142  1589 0
-1586 -1587  1588 -142 -1590 0
-1586 -1587  1588 -142  1591 0

c  -1+1 --> 0
c    ( b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0 ∧  p_142) -> (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧ -b^{1, 143}_0)
c  in CNF:
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_2
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_1
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_0
c  in DIMACS:
-1586  1587 -1588 -142 -1589 0
-1586  1587 -1588 -142 -1590 0
-1586  1587 -1588 -142 -1591 0

c  0+1 --> 1
c    (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧  p_142) -> (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0)
c  in CNF:
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_2
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_1
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨  b^{1, 143}_0
c  in DIMACS:
 1586  1587  1588 -142 -1589 0
 1586  1587  1588 -142 -1590 0
 1586  1587  1588 -142  1591 0

c  1+1 --> 2
c    (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0 ∧  p_142) -> (-b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0)
c  in CNF:
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_2
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨  b^{1, 143}_1
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ -p_142 ∨ -b^{1, 143}_0
c  in DIMACS:
 1586  1587 -1588 -142 -1589 0
 1586  1587 -1588 -142  1590 0
 1586  1587 -1588 -142 -1591 0

c  2+1 --> break 
c    (-b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧  p_142) -> break
c  in CNF:
c     b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ -p_142 ∨ break
c  in DIMACS:
 1586 -1587  1588 -142 1162 0


c  2-1 --> 1
c    (-b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧ -p_142) -> (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0)
c  in CNF:
c     b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_2
c     b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_1
c     b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨  b^{1, 143}_0
c  in DIMACS:
 1586 -1587  1588  142 -1589 0
 1586 -1587  1588  142 -1590 0
 1586 -1587  1588  142  1591 0

c  1-1 --> 0
c    (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0 ∧ -p_142) -> (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧ -b^{1, 143}_0)
c  in CNF:
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_2
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_1
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_0
c  in DIMACS:
 1586  1587 -1588  142 -1589 0
 1586  1587 -1588  142 -1590 0
 1586  1587 -1588  142 -1591 0

c  0-1 --> -1
c    (-b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧ -p_142) -> ( b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0)
c  in CNF:
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨  b^{1, 143}_2
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_1
c     b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨  b^{1, 143}_0
c  in DIMACS:
 1586  1587  1588  142  1589 0
 1586  1587  1588  142 -1590 0
 1586  1587  1588  142  1591 0

c  -1-1 --> -2
c    ( b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧  b^{1, 142}_0 ∧ -p_142) -> ( b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0)
c  in CNF:
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨  b^{1, 143}_2
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨  b^{1, 143}_1
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨  p_142 ∨ -b^{1, 143}_0
c  in DIMACS:
-1586  1587 -1588  142  1589 0
-1586  1587 -1588  142  1590 0
-1586  1587 -1588  142 -1591 0

c  -2-1 --> break 
c    ( b^{1, 142}_2 ∧  b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧ -p_142) -> break
c  in CNF:
c    -b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨  b^{1, 142}_0 ∨  p_142 ∨ break
c  in DIMACS:
-1586 -1587  1588  142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 142}_2 ∧ -b^{1, 142}_1 ∧ -b^{1, 142}_0 ∧ true) 
c  in CNF:
c    -b^{1, 142}_2 ∨  b^{1, 142}_1 ∨  b^{1, 142}_0 ∨ false 
c  in DIMACS:
-1586  1587  1588  0

c  3 does not represent an automaton state.
c    -(-b^{1, 142}_2 ∧  b^{1, 142}_1 ∧  b^{1, 142}_0 ∧ true) 
c  in CNF:
c     b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ false 
c  in DIMACS:
 1586 -1587 -1588  0
c  -3 does not represent an automaton state.
c    -( b^{1, 142}_2 ∧  b^{1, 142}_1 ∧  b^{1, 142}_0 ∧ true) 
c  in CNF:
c    -b^{1, 142}_2 ∨ -b^{1, 142}_1 ∨ -b^{1, 142}_0 ∨ false 
c  in DIMACS:
-1586 -1587 -1588  0

c i = 143
c  -2+1 --> -1
c    ( b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧  p_143) -> ( b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0)
c  in CNF:
c    -b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨  b^{1, 144}_2
c    -b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_1
c    -b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨  b^{1, 144}_0
c  in DIMACS:
-1589 -1590  1591 -143  1592 0
-1589 -1590  1591 -143 -1593 0
-1589 -1590  1591 -143  1594 0

c  -1+1 --> 0
c    ( b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0 ∧  p_143) -> (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧ -b^{1, 144}_0)
c  in CNF:
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_2
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_1
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_0
c  in DIMACS:
-1589  1590 -1591 -143 -1592 0
-1589  1590 -1591 -143 -1593 0
-1589  1590 -1591 -143 -1594 0

c  0+1 --> 1
c    (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧  p_143) -> (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0)
c  in CNF:
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_2
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_1
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨  b^{1, 144}_0
c  in DIMACS:
 1589  1590  1591 -143 -1592 0
 1589  1590  1591 -143 -1593 0
 1589  1590  1591 -143  1594 0

c  1+1 --> 2
c    (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0 ∧  p_143) -> (-b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0)
c  in CNF:
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_2
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨  b^{1, 144}_1
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ -p_143 ∨ -b^{1, 144}_0
c  in DIMACS:
 1589  1590 -1591 -143 -1592 0
 1589  1590 -1591 -143  1593 0
 1589  1590 -1591 -143 -1594 0

c  2+1 --> break 
c    (-b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧  p_143) -> break
c  in CNF:
c     b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ -p_143 ∨ break
c  in DIMACS:
 1589 -1590  1591 -143 1162 0


c  2-1 --> 1
c    (-b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧ -p_143) -> (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0)
c  in CNF:
c     b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_2
c     b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_1
c     b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨  b^{1, 144}_0
c  in DIMACS:
 1589 -1590  1591  143 -1592 0
 1589 -1590  1591  143 -1593 0
 1589 -1590  1591  143  1594 0

c  1-1 --> 0
c    (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0 ∧ -p_143) -> (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧ -b^{1, 144}_0)
c  in CNF:
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_2
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_1
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_0
c  in DIMACS:
 1589  1590 -1591  143 -1592 0
 1589  1590 -1591  143 -1593 0
 1589  1590 -1591  143 -1594 0

c  0-1 --> -1
c    (-b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧ -p_143) -> ( b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0)
c  in CNF:
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨  b^{1, 144}_2
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_1
c     b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨  b^{1, 144}_0
c  in DIMACS:
 1589  1590  1591  143  1592 0
 1589  1590  1591  143 -1593 0
 1589  1590  1591  143  1594 0

c  -1-1 --> -2
c    ( b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧  b^{1, 143}_0 ∧ -p_143) -> ( b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0)
c  in CNF:
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨  b^{1, 144}_2
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨  b^{1, 144}_1
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨  p_143 ∨ -b^{1, 144}_0
c  in DIMACS:
-1589  1590 -1591  143  1592 0
-1589  1590 -1591  143  1593 0
-1589  1590 -1591  143 -1594 0

c  -2-1 --> break 
c    ( b^{1, 143}_2 ∧  b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧ -p_143) -> break
c  in CNF:
c    -b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨  b^{1, 143}_0 ∨  p_143 ∨ break
c  in DIMACS:
-1589 -1590  1591  143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 143}_2 ∧ -b^{1, 143}_1 ∧ -b^{1, 143}_0 ∧ true) 
c  in CNF:
c    -b^{1, 143}_2 ∨  b^{1, 143}_1 ∨  b^{1, 143}_0 ∨ false 
c  in DIMACS:
-1589  1590  1591  0

c  3 does not represent an automaton state.
c    -(-b^{1, 143}_2 ∧  b^{1, 143}_1 ∧  b^{1, 143}_0 ∧ true) 
c  in CNF:
c     b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ false 
c  in DIMACS:
 1589 -1590 -1591  0
c  -3 does not represent an automaton state.
c    -( b^{1, 143}_2 ∧  b^{1, 143}_1 ∧  b^{1, 143}_0 ∧ true) 
c  in CNF:
c    -b^{1, 143}_2 ∨ -b^{1, 143}_1 ∨ -b^{1, 143}_0 ∨ false 
c  in DIMACS:
-1589 -1590 -1591  0

c i = 144
c  -2+1 --> -1
c    ( b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧  p_144) -> ( b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0)
c  in CNF:
c    -b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨  b^{1, 145}_2
c    -b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_1
c    -b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨  b^{1, 145}_0
c  in DIMACS:
-1592 -1593  1594 -144  1595 0
-1592 -1593  1594 -144 -1596 0
-1592 -1593  1594 -144  1597 0

c  -1+1 --> 0
c    ( b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0 ∧  p_144) -> (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧ -b^{1, 145}_0)
c  in CNF:
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_2
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_1
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_0
c  in DIMACS:
-1592  1593 -1594 -144 -1595 0
-1592  1593 -1594 -144 -1596 0
-1592  1593 -1594 -144 -1597 0

c  0+1 --> 1
c    (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧  p_144) -> (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0)
c  in CNF:
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_2
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_1
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨  b^{1, 145}_0
c  in DIMACS:
 1592  1593  1594 -144 -1595 0
 1592  1593  1594 -144 -1596 0
 1592  1593  1594 -144  1597 0

c  1+1 --> 2
c    (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0 ∧  p_144) -> (-b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0)
c  in CNF:
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_2
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨  b^{1, 145}_1
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ -p_144 ∨ -b^{1, 145}_0
c  in DIMACS:
 1592  1593 -1594 -144 -1595 0
 1592  1593 -1594 -144  1596 0
 1592  1593 -1594 -144 -1597 0

c  2+1 --> break 
c    (-b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧  p_144) -> break
c  in CNF:
c     b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 1592 -1593  1594 -144 1162 0


c  2-1 --> 1
c    (-b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧ -p_144) -> (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0)
c  in CNF:
c     b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_2
c     b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_1
c     b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨  b^{1, 145}_0
c  in DIMACS:
 1592 -1593  1594  144 -1595 0
 1592 -1593  1594  144 -1596 0
 1592 -1593  1594  144  1597 0

c  1-1 --> 0
c    (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0 ∧ -p_144) -> (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧ -b^{1, 145}_0)
c  in CNF:
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_2
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_1
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_0
c  in DIMACS:
 1592  1593 -1594  144 -1595 0
 1592  1593 -1594  144 -1596 0
 1592  1593 -1594  144 -1597 0

c  0-1 --> -1
c    (-b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧ -p_144) -> ( b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0)
c  in CNF:
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨  b^{1, 145}_2
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_1
c     b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨  b^{1, 145}_0
c  in DIMACS:
 1592  1593  1594  144  1595 0
 1592  1593  1594  144 -1596 0
 1592  1593  1594  144  1597 0

c  -1-1 --> -2
c    ( b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧  b^{1, 144}_0 ∧ -p_144) -> ( b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0)
c  in CNF:
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨  b^{1, 145}_2
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨  b^{1, 145}_1
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨  p_144 ∨ -b^{1, 145}_0
c  in DIMACS:
-1592  1593 -1594  144  1595 0
-1592  1593 -1594  144  1596 0
-1592  1593 -1594  144 -1597 0

c  -2-1 --> break 
c    ( b^{1, 144}_2 ∧  b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨  b^{1, 144}_0 ∨  p_144 ∨ break
c  in DIMACS:
-1592 -1593  1594  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 144}_2 ∧ -b^{1, 144}_1 ∧ -b^{1, 144}_0 ∧ true) 
c  in CNF:
c    -b^{1, 144}_2 ∨  b^{1, 144}_1 ∨  b^{1, 144}_0 ∨ false 
c  in DIMACS:
-1592  1593  1594  0

c  3 does not represent an automaton state.
c    -(-b^{1, 144}_2 ∧  b^{1, 144}_1 ∧  b^{1, 144}_0 ∧ true) 
c  in CNF:
c     b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ false 
c  in DIMACS:
 1592 -1593 -1594  0
c  -3 does not represent an automaton state.
c    -( b^{1, 144}_2 ∧  b^{1, 144}_1 ∧  b^{1, 144}_0 ∧ true) 
c  in CNF:
c    -b^{1, 144}_2 ∨ -b^{1, 144}_1 ∨ -b^{1, 144}_0 ∨ false 
c  in DIMACS:
-1592 -1593 -1594  0

c i = 145
c  -2+1 --> -1
c    ( b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧  p_145) -> ( b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0)
c  in CNF:
c    -b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨  b^{1, 146}_2
c    -b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_1
c    -b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨  b^{1, 146}_0
c  in DIMACS:
-1595 -1596  1597 -145  1598 0
-1595 -1596  1597 -145 -1599 0
-1595 -1596  1597 -145  1600 0

c  -1+1 --> 0
c    ( b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0 ∧  p_145) -> (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧ -b^{1, 146}_0)
c  in CNF:
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_2
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_1
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_0
c  in DIMACS:
-1595  1596 -1597 -145 -1598 0
-1595  1596 -1597 -145 -1599 0
-1595  1596 -1597 -145 -1600 0

c  0+1 --> 1
c    (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧  p_145) -> (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0)
c  in CNF:
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_2
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_1
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨  b^{1, 146}_0
c  in DIMACS:
 1595  1596  1597 -145 -1598 0
 1595  1596  1597 -145 -1599 0
 1595  1596  1597 -145  1600 0

c  1+1 --> 2
c    (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0 ∧  p_145) -> (-b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0)
c  in CNF:
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_2
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨  b^{1, 146}_1
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ -p_145 ∨ -b^{1, 146}_0
c  in DIMACS:
 1595  1596 -1597 -145 -1598 0
 1595  1596 -1597 -145  1599 0
 1595  1596 -1597 -145 -1600 0

c  2+1 --> break 
c    (-b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧  p_145) -> break
c  in CNF:
c     b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ -p_145 ∨ break
c  in DIMACS:
 1595 -1596  1597 -145 1162 0


c  2-1 --> 1
c    (-b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧ -p_145) -> (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0)
c  in CNF:
c     b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_2
c     b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_1
c     b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨  b^{1, 146}_0
c  in DIMACS:
 1595 -1596  1597  145 -1598 0
 1595 -1596  1597  145 -1599 0
 1595 -1596  1597  145  1600 0

c  1-1 --> 0
c    (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0 ∧ -p_145) -> (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧ -b^{1, 146}_0)
c  in CNF:
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_2
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_1
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_0
c  in DIMACS:
 1595  1596 -1597  145 -1598 0
 1595  1596 -1597  145 -1599 0
 1595  1596 -1597  145 -1600 0

c  0-1 --> -1
c    (-b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧ -p_145) -> ( b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0)
c  in CNF:
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨  b^{1, 146}_2
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_1
c     b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨  b^{1, 146}_0
c  in DIMACS:
 1595  1596  1597  145  1598 0
 1595  1596  1597  145 -1599 0
 1595  1596  1597  145  1600 0

c  -1-1 --> -2
c    ( b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧  b^{1, 145}_0 ∧ -p_145) -> ( b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0)
c  in CNF:
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨  b^{1, 146}_2
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨  b^{1, 146}_1
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨  p_145 ∨ -b^{1, 146}_0
c  in DIMACS:
-1595  1596 -1597  145  1598 0
-1595  1596 -1597  145  1599 0
-1595  1596 -1597  145 -1600 0

c  -2-1 --> break 
c    ( b^{1, 145}_2 ∧  b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧ -p_145) -> break
c  in CNF:
c    -b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨  b^{1, 145}_0 ∨  p_145 ∨ break
c  in DIMACS:
-1595 -1596  1597  145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 145}_2 ∧ -b^{1, 145}_1 ∧ -b^{1, 145}_0 ∧ true) 
c  in CNF:
c    -b^{1, 145}_2 ∨  b^{1, 145}_1 ∨  b^{1, 145}_0 ∨ false 
c  in DIMACS:
-1595  1596  1597  0

c  3 does not represent an automaton state.
c    -(-b^{1, 145}_2 ∧  b^{1, 145}_1 ∧  b^{1, 145}_0 ∧ true) 
c  in CNF:
c     b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ false 
c  in DIMACS:
 1595 -1596 -1597  0
c  -3 does not represent an automaton state.
c    -( b^{1, 145}_2 ∧  b^{1, 145}_1 ∧  b^{1, 145}_0 ∧ true) 
c  in CNF:
c    -b^{1, 145}_2 ∨ -b^{1, 145}_1 ∨ -b^{1, 145}_0 ∨ false 
c  in DIMACS:
-1595 -1596 -1597  0

c i = 146
c  -2+1 --> -1
c    ( b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧  p_146) -> ( b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0)
c  in CNF:
c    -b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨  b^{1, 147}_2
c    -b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_1
c    -b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨  b^{1, 147}_0
c  in DIMACS:
-1598 -1599  1600 -146  1601 0
-1598 -1599  1600 -146 -1602 0
-1598 -1599  1600 -146  1603 0

c  -1+1 --> 0
c    ( b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0 ∧  p_146) -> (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧ -b^{1, 147}_0)
c  in CNF:
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_2
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_1
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_0
c  in DIMACS:
-1598  1599 -1600 -146 -1601 0
-1598  1599 -1600 -146 -1602 0
-1598  1599 -1600 -146 -1603 0

c  0+1 --> 1
c    (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧  p_146) -> (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0)
c  in CNF:
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_2
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_1
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨  b^{1, 147}_0
c  in DIMACS:
 1598  1599  1600 -146 -1601 0
 1598  1599  1600 -146 -1602 0
 1598  1599  1600 -146  1603 0

c  1+1 --> 2
c    (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0 ∧  p_146) -> (-b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0)
c  in CNF:
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_2
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨  b^{1, 147}_1
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ -p_146 ∨ -b^{1, 147}_0
c  in DIMACS:
 1598  1599 -1600 -146 -1601 0
 1598  1599 -1600 -146  1602 0
 1598  1599 -1600 -146 -1603 0

c  2+1 --> break 
c    (-b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧  p_146) -> break
c  in CNF:
c     b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ -p_146 ∨ break
c  in DIMACS:
 1598 -1599  1600 -146 1162 0


c  2-1 --> 1
c    (-b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧ -p_146) -> (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0)
c  in CNF:
c     b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_2
c     b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_1
c     b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨  b^{1, 147}_0
c  in DIMACS:
 1598 -1599  1600  146 -1601 0
 1598 -1599  1600  146 -1602 0
 1598 -1599  1600  146  1603 0

c  1-1 --> 0
c    (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0 ∧ -p_146) -> (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧ -b^{1, 147}_0)
c  in CNF:
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_2
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_1
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_0
c  in DIMACS:
 1598  1599 -1600  146 -1601 0
 1598  1599 -1600  146 -1602 0
 1598  1599 -1600  146 -1603 0

c  0-1 --> -1
c    (-b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧ -p_146) -> ( b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0)
c  in CNF:
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨  b^{1, 147}_2
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_1
c     b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨  b^{1, 147}_0
c  in DIMACS:
 1598  1599  1600  146  1601 0
 1598  1599  1600  146 -1602 0
 1598  1599  1600  146  1603 0

c  -1-1 --> -2
c    ( b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧  b^{1, 146}_0 ∧ -p_146) -> ( b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0)
c  in CNF:
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨  b^{1, 147}_2
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨  b^{1, 147}_1
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨  p_146 ∨ -b^{1, 147}_0
c  in DIMACS:
-1598  1599 -1600  146  1601 0
-1598  1599 -1600  146  1602 0
-1598  1599 -1600  146 -1603 0

c  -2-1 --> break 
c    ( b^{1, 146}_2 ∧  b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧ -p_146) -> break
c  in CNF:
c    -b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨  b^{1, 146}_0 ∨  p_146 ∨ break
c  in DIMACS:
-1598 -1599  1600  146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 146}_2 ∧ -b^{1, 146}_1 ∧ -b^{1, 146}_0 ∧ true) 
c  in CNF:
c    -b^{1, 146}_2 ∨  b^{1, 146}_1 ∨  b^{1, 146}_0 ∨ false 
c  in DIMACS:
-1598  1599  1600  0

c  3 does not represent an automaton state.
c    -(-b^{1, 146}_2 ∧  b^{1, 146}_1 ∧  b^{1, 146}_0 ∧ true) 
c  in CNF:
c     b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ false 
c  in DIMACS:
 1598 -1599 -1600  0
c  -3 does not represent an automaton state.
c    -( b^{1, 146}_2 ∧  b^{1, 146}_1 ∧  b^{1, 146}_0 ∧ true) 
c  in CNF:
c    -b^{1, 146}_2 ∨ -b^{1, 146}_1 ∨ -b^{1, 146}_0 ∨ false 
c  in DIMACS:
-1598 -1599 -1600  0

c i = 147
c  -2+1 --> -1
c    ( b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧  p_147) -> ( b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0)
c  in CNF:
c    -b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨  b^{1, 148}_2
c    -b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_1
c    -b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨  b^{1, 148}_0
c  in DIMACS:
-1601 -1602  1603 -147  1604 0
-1601 -1602  1603 -147 -1605 0
-1601 -1602  1603 -147  1606 0

c  -1+1 --> 0
c    ( b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0 ∧  p_147) -> (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧ -b^{1, 148}_0)
c  in CNF:
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_2
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_1
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_0
c  in DIMACS:
-1601  1602 -1603 -147 -1604 0
-1601  1602 -1603 -147 -1605 0
-1601  1602 -1603 -147 -1606 0

c  0+1 --> 1
c    (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧  p_147) -> (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0)
c  in CNF:
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_2
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_1
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨  b^{1, 148}_0
c  in DIMACS:
 1601  1602  1603 -147 -1604 0
 1601  1602  1603 -147 -1605 0
 1601  1602  1603 -147  1606 0

c  1+1 --> 2
c    (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0 ∧  p_147) -> (-b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0)
c  in CNF:
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_2
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨  b^{1, 148}_1
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ -p_147 ∨ -b^{1, 148}_0
c  in DIMACS:
 1601  1602 -1603 -147 -1604 0
 1601  1602 -1603 -147  1605 0
 1601  1602 -1603 -147 -1606 0

c  2+1 --> break 
c    (-b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧  p_147) -> break
c  in CNF:
c     b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 1601 -1602  1603 -147 1162 0


c  2-1 --> 1
c    (-b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧ -p_147) -> (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0)
c  in CNF:
c     b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_2
c     b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_1
c     b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨  b^{1, 148}_0
c  in DIMACS:
 1601 -1602  1603  147 -1604 0
 1601 -1602  1603  147 -1605 0
 1601 -1602  1603  147  1606 0

c  1-1 --> 0
c    (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0 ∧ -p_147) -> (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧ -b^{1, 148}_0)
c  in CNF:
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_2
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_1
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_0
c  in DIMACS:
 1601  1602 -1603  147 -1604 0
 1601  1602 -1603  147 -1605 0
 1601  1602 -1603  147 -1606 0

c  0-1 --> -1
c    (-b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧ -p_147) -> ( b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0)
c  in CNF:
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨  b^{1, 148}_2
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_1
c     b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨  b^{1, 148}_0
c  in DIMACS:
 1601  1602  1603  147  1604 0
 1601  1602  1603  147 -1605 0
 1601  1602  1603  147  1606 0

c  -1-1 --> -2
c    ( b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧  b^{1, 147}_0 ∧ -p_147) -> ( b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0)
c  in CNF:
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨  b^{1, 148}_2
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨  b^{1, 148}_1
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨  p_147 ∨ -b^{1, 148}_0
c  in DIMACS:
-1601  1602 -1603  147  1604 0
-1601  1602 -1603  147  1605 0
-1601  1602 -1603  147 -1606 0

c  -2-1 --> break 
c    ( b^{1, 147}_2 ∧  b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨  b^{1, 147}_0 ∨  p_147 ∨ break
c  in DIMACS:
-1601 -1602  1603  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 147}_2 ∧ -b^{1, 147}_1 ∧ -b^{1, 147}_0 ∧ true) 
c  in CNF:
c    -b^{1, 147}_2 ∨  b^{1, 147}_1 ∨  b^{1, 147}_0 ∨ false 
c  in DIMACS:
-1601  1602  1603  0

c  3 does not represent an automaton state.
c    -(-b^{1, 147}_2 ∧  b^{1, 147}_1 ∧  b^{1, 147}_0 ∧ true) 
c  in CNF:
c     b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ false 
c  in DIMACS:
 1601 -1602 -1603  0
c  -3 does not represent an automaton state.
c    -( b^{1, 147}_2 ∧  b^{1, 147}_1 ∧  b^{1, 147}_0 ∧ true) 
c  in CNF:
c    -b^{1, 147}_2 ∨ -b^{1, 147}_1 ∨ -b^{1, 147}_0 ∨ false 
c  in DIMACS:
-1601 -1602 -1603  0

c i = 148
c  -2+1 --> -1
c    ( b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧  p_148) -> ( b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0)
c  in CNF:
c    -b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨  b^{1, 149}_2
c    -b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_1
c    -b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨  b^{1, 149}_0
c  in DIMACS:
-1604 -1605  1606 -148  1607 0
-1604 -1605  1606 -148 -1608 0
-1604 -1605  1606 -148  1609 0

c  -1+1 --> 0
c    ( b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0 ∧  p_148) -> (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧ -b^{1, 149}_0)
c  in CNF:
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_2
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_1
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_0
c  in DIMACS:
-1604  1605 -1606 -148 -1607 0
-1604  1605 -1606 -148 -1608 0
-1604  1605 -1606 -148 -1609 0

c  0+1 --> 1
c    (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧  p_148) -> (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0)
c  in CNF:
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_2
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_1
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨  b^{1, 149}_0
c  in DIMACS:
 1604  1605  1606 -148 -1607 0
 1604  1605  1606 -148 -1608 0
 1604  1605  1606 -148  1609 0

c  1+1 --> 2
c    (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0 ∧  p_148) -> (-b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0)
c  in CNF:
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_2
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨  b^{1, 149}_1
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ -p_148 ∨ -b^{1, 149}_0
c  in DIMACS:
 1604  1605 -1606 -148 -1607 0
 1604  1605 -1606 -148  1608 0
 1604  1605 -1606 -148 -1609 0

c  2+1 --> break 
c    (-b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧  p_148) -> break
c  in CNF:
c     b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 1604 -1605  1606 -148 1162 0


c  2-1 --> 1
c    (-b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧ -p_148) -> (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0)
c  in CNF:
c     b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_2
c     b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_1
c     b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨  b^{1, 149}_0
c  in DIMACS:
 1604 -1605  1606  148 -1607 0
 1604 -1605  1606  148 -1608 0
 1604 -1605  1606  148  1609 0

c  1-1 --> 0
c    (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0 ∧ -p_148) -> (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧ -b^{1, 149}_0)
c  in CNF:
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_2
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_1
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_0
c  in DIMACS:
 1604  1605 -1606  148 -1607 0
 1604  1605 -1606  148 -1608 0
 1604  1605 -1606  148 -1609 0

c  0-1 --> -1
c    (-b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧ -p_148) -> ( b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0)
c  in CNF:
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨  b^{1, 149}_2
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_1
c     b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨  b^{1, 149}_0
c  in DIMACS:
 1604  1605  1606  148  1607 0
 1604  1605  1606  148 -1608 0
 1604  1605  1606  148  1609 0

c  -1-1 --> -2
c    ( b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧  b^{1, 148}_0 ∧ -p_148) -> ( b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0)
c  in CNF:
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨  b^{1, 149}_2
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨  b^{1, 149}_1
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨  p_148 ∨ -b^{1, 149}_0
c  in DIMACS:
-1604  1605 -1606  148  1607 0
-1604  1605 -1606  148  1608 0
-1604  1605 -1606  148 -1609 0

c  -2-1 --> break 
c    ( b^{1, 148}_2 ∧  b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨  b^{1, 148}_0 ∨  p_148 ∨ break
c  in DIMACS:
-1604 -1605  1606  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 148}_2 ∧ -b^{1, 148}_1 ∧ -b^{1, 148}_0 ∧ true) 
c  in CNF:
c    -b^{1, 148}_2 ∨  b^{1, 148}_1 ∨  b^{1, 148}_0 ∨ false 
c  in DIMACS:
-1604  1605  1606  0

c  3 does not represent an automaton state.
c    -(-b^{1, 148}_2 ∧  b^{1, 148}_1 ∧  b^{1, 148}_0 ∧ true) 
c  in CNF:
c     b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ false 
c  in DIMACS:
 1604 -1605 -1606  0
c  -3 does not represent an automaton state.
c    -( b^{1, 148}_2 ∧  b^{1, 148}_1 ∧  b^{1, 148}_0 ∧ true) 
c  in CNF:
c    -b^{1, 148}_2 ∨ -b^{1, 148}_1 ∨ -b^{1, 148}_0 ∨ false 
c  in DIMACS:
-1604 -1605 -1606  0

c i = 149
c  -2+1 --> -1
c    ( b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧  p_149) -> ( b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0)
c  in CNF:
c    -b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨  b^{1, 150}_2
c    -b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_1
c    -b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨  b^{1, 150}_0
c  in DIMACS:
-1607 -1608  1609 -149  1610 0
-1607 -1608  1609 -149 -1611 0
-1607 -1608  1609 -149  1612 0

c  -1+1 --> 0
c    ( b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0 ∧  p_149) -> (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧ -b^{1, 150}_0)
c  in CNF:
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_2
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_1
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_0
c  in DIMACS:
-1607  1608 -1609 -149 -1610 0
-1607  1608 -1609 -149 -1611 0
-1607  1608 -1609 -149 -1612 0

c  0+1 --> 1
c    (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧  p_149) -> (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0)
c  in CNF:
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_2
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_1
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨  b^{1, 150}_0
c  in DIMACS:
 1607  1608  1609 -149 -1610 0
 1607  1608  1609 -149 -1611 0
 1607  1608  1609 -149  1612 0

c  1+1 --> 2
c    (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0 ∧  p_149) -> (-b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0)
c  in CNF:
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_2
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨  b^{1, 150}_1
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ -p_149 ∨ -b^{1, 150}_0
c  in DIMACS:
 1607  1608 -1609 -149 -1610 0
 1607  1608 -1609 -149  1611 0
 1607  1608 -1609 -149 -1612 0

c  2+1 --> break 
c    (-b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧  p_149) -> break
c  in CNF:
c     b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ -p_149 ∨ break
c  in DIMACS:
 1607 -1608  1609 -149 1162 0


c  2-1 --> 1
c    (-b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧ -p_149) -> (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0)
c  in CNF:
c     b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_2
c     b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_1
c     b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨  b^{1, 150}_0
c  in DIMACS:
 1607 -1608  1609  149 -1610 0
 1607 -1608  1609  149 -1611 0
 1607 -1608  1609  149  1612 0

c  1-1 --> 0
c    (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0 ∧ -p_149) -> (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧ -b^{1, 150}_0)
c  in CNF:
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_2
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_1
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_0
c  in DIMACS:
 1607  1608 -1609  149 -1610 0
 1607  1608 -1609  149 -1611 0
 1607  1608 -1609  149 -1612 0

c  0-1 --> -1
c    (-b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧ -p_149) -> ( b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0)
c  in CNF:
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨  b^{1, 150}_2
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_1
c     b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨  b^{1, 150}_0
c  in DIMACS:
 1607  1608  1609  149  1610 0
 1607  1608  1609  149 -1611 0
 1607  1608  1609  149  1612 0

c  -1-1 --> -2
c    ( b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧  b^{1, 149}_0 ∧ -p_149) -> ( b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0)
c  in CNF:
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨  b^{1, 150}_2
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨  b^{1, 150}_1
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨  p_149 ∨ -b^{1, 150}_0
c  in DIMACS:
-1607  1608 -1609  149  1610 0
-1607  1608 -1609  149  1611 0
-1607  1608 -1609  149 -1612 0

c  -2-1 --> break 
c    ( b^{1, 149}_2 ∧  b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧ -p_149) -> break
c  in CNF:
c    -b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨  b^{1, 149}_0 ∨  p_149 ∨ break
c  in DIMACS:
-1607 -1608  1609  149 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 149}_2 ∧ -b^{1, 149}_1 ∧ -b^{1, 149}_0 ∧ true) 
c  in CNF:
c    -b^{1, 149}_2 ∨  b^{1, 149}_1 ∨  b^{1, 149}_0 ∨ false 
c  in DIMACS:
-1607  1608  1609  0

c  3 does not represent an automaton state.
c    -(-b^{1, 149}_2 ∧  b^{1, 149}_1 ∧  b^{1, 149}_0 ∧ true) 
c  in CNF:
c     b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ false 
c  in DIMACS:
 1607 -1608 -1609  0
c  -3 does not represent an automaton state.
c    -( b^{1, 149}_2 ∧  b^{1, 149}_1 ∧  b^{1, 149}_0 ∧ true) 
c  in CNF:
c    -b^{1, 149}_2 ∨ -b^{1, 149}_1 ∨ -b^{1, 149}_0 ∨ false 
c  in DIMACS:
-1607 -1608 -1609  0

c i = 150
c  -2+1 --> -1
c    ( b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧  p_150) -> ( b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0)
c  in CNF:
c    -b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨  b^{1, 151}_2
c    -b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_1
c    -b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨  b^{1, 151}_0
c  in DIMACS:
-1610 -1611  1612 -150  1613 0
-1610 -1611  1612 -150 -1614 0
-1610 -1611  1612 -150  1615 0

c  -1+1 --> 0
c    ( b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0 ∧  p_150) -> (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧ -b^{1, 151}_0)
c  in CNF:
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_2
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_1
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_0
c  in DIMACS:
-1610  1611 -1612 -150 -1613 0
-1610  1611 -1612 -150 -1614 0
-1610  1611 -1612 -150 -1615 0

c  0+1 --> 1
c    (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧  p_150) -> (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0)
c  in CNF:
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_2
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_1
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨  b^{1, 151}_0
c  in DIMACS:
 1610  1611  1612 -150 -1613 0
 1610  1611  1612 -150 -1614 0
 1610  1611  1612 -150  1615 0

c  1+1 --> 2
c    (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0 ∧  p_150) -> (-b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0)
c  in CNF:
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_2
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨  b^{1, 151}_1
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ -p_150 ∨ -b^{1, 151}_0
c  in DIMACS:
 1610  1611 -1612 -150 -1613 0
 1610  1611 -1612 -150  1614 0
 1610  1611 -1612 -150 -1615 0

c  2+1 --> break 
c    (-b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧  p_150) -> break
c  in CNF:
c     b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 1610 -1611  1612 -150 1162 0


c  2-1 --> 1
c    (-b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧ -p_150) -> (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0)
c  in CNF:
c     b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_2
c     b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_1
c     b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨  b^{1, 151}_0
c  in DIMACS:
 1610 -1611  1612  150 -1613 0
 1610 -1611  1612  150 -1614 0
 1610 -1611  1612  150  1615 0

c  1-1 --> 0
c    (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0 ∧ -p_150) -> (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧ -b^{1, 151}_0)
c  in CNF:
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_2
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_1
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_0
c  in DIMACS:
 1610  1611 -1612  150 -1613 0
 1610  1611 -1612  150 -1614 0
 1610  1611 -1612  150 -1615 0

c  0-1 --> -1
c    (-b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧ -p_150) -> ( b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0)
c  in CNF:
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨  b^{1, 151}_2
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_1
c     b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨  b^{1, 151}_0
c  in DIMACS:
 1610  1611  1612  150  1613 0
 1610  1611  1612  150 -1614 0
 1610  1611  1612  150  1615 0

c  -1-1 --> -2
c    ( b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧  b^{1, 150}_0 ∧ -p_150) -> ( b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0)
c  in CNF:
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨  b^{1, 151}_2
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨  b^{1, 151}_1
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨  p_150 ∨ -b^{1, 151}_0
c  in DIMACS:
-1610  1611 -1612  150  1613 0
-1610  1611 -1612  150  1614 0
-1610  1611 -1612  150 -1615 0

c  -2-1 --> break 
c    ( b^{1, 150}_2 ∧  b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨  b^{1, 150}_0 ∨  p_150 ∨ break
c  in DIMACS:
-1610 -1611  1612  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 150}_2 ∧ -b^{1, 150}_1 ∧ -b^{1, 150}_0 ∧ true) 
c  in CNF:
c    -b^{1, 150}_2 ∨  b^{1, 150}_1 ∨  b^{1, 150}_0 ∨ false 
c  in DIMACS:
-1610  1611  1612  0

c  3 does not represent an automaton state.
c    -(-b^{1, 150}_2 ∧  b^{1, 150}_1 ∧  b^{1, 150}_0 ∧ true) 
c  in CNF:
c     b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ false 
c  in DIMACS:
 1610 -1611 -1612  0
c  -3 does not represent an automaton state.
c    -( b^{1, 150}_2 ∧  b^{1, 150}_1 ∧  b^{1, 150}_0 ∧ true) 
c  in CNF:
c    -b^{1, 150}_2 ∨ -b^{1, 150}_1 ∨ -b^{1, 150}_0 ∨ false 
c  in DIMACS:
-1610 -1611 -1612  0

c i = 151
c  -2+1 --> -1
c    ( b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧  p_151) -> ( b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0)
c  in CNF:
c    -b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨  b^{1, 152}_2
c    -b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_1
c    -b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨  b^{1, 152}_0
c  in DIMACS:
-1613 -1614  1615 -151  1616 0
-1613 -1614  1615 -151 -1617 0
-1613 -1614  1615 -151  1618 0

c  -1+1 --> 0
c    ( b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0 ∧  p_151) -> (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧ -b^{1, 152}_0)
c  in CNF:
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_2
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_1
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_0
c  in DIMACS:
-1613  1614 -1615 -151 -1616 0
-1613  1614 -1615 -151 -1617 0
-1613  1614 -1615 -151 -1618 0

c  0+1 --> 1
c    (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧  p_151) -> (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0)
c  in CNF:
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_2
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_1
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨  b^{1, 152}_0
c  in DIMACS:
 1613  1614  1615 -151 -1616 0
 1613  1614  1615 -151 -1617 0
 1613  1614  1615 -151  1618 0

c  1+1 --> 2
c    (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0 ∧  p_151) -> (-b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0)
c  in CNF:
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_2
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨  b^{1, 152}_1
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ -p_151 ∨ -b^{1, 152}_0
c  in DIMACS:
 1613  1614 -1615 -151 -1616 0
 1613  1614 -1615 -151  1617 0
 1613  1614 -1615 -151 -1618 0

c  2+1 --> break 
c    (-b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧  p_151) -> break
c  in CNF:
c     b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ -p_151 ∨ break
c  in DIMACS:
 1613 -1614  1615 -151 1162 0


c  2-1 --> 1
c    (-b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧ -p_151) -> (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0)
c  in CNF:
c     b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_2
c     b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_1
c     b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨  b^{1, 152}_0
c  in DIMACS:
 1613 -1614  1615  151 -1616 0
 1613 -1614  1615  151 -1617 0
 1613 -1614  1615  151  1618 0

c  1-1 --> 0
c    (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0 ∧ -p_151) -> (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧ -b^{1, 152}_0)
c  in CNF:
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_2
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_1
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_0
c  in DIMACS:
 1613  1614 -1615  151 -1616 0
 1613  1614 -1615  151 -1617 0
 1613  1614 -1615  151 -1618 0

c  0-1 --> -1
c    (-b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧ -p_151) -> ( b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0)
c  in CNF:
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨  b^{1, 152}_2
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_1
c     b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨  b^{1, 152}_0
c  in DIMACS:
 1613  1614  1615  151  1616 0
 1613  1614  1615  151 -1617 0
 1613  1614  1615  151  1618 0

c  -1-1 --> -2
c    ( b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧  b^{1, 151}_0 ∧ -p_151) -> ( b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0)
c  in CNF:
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨  b^{1, 152}_2
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨  b^{1, 152}_1
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨  p_151 ∨ -b^{1, 152}_0
c  in DIMACS:
-1613  1614 -1615  151  1616 0
-1613  1614 -1615  151  1617 0
-1613  1614 -1615  151 -1618 0

c  -2-1 --> break 
c    ( b^{1, 151}_2 ∧  b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧ -p_151) -> break
c  in CNF:
c    -b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨  b^{1, 151}_0 ∨  p_151 ∨ break
c  in DIMACS:
-1613 -1614  1615  151 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 151}_2 ∧ -b^{1, 151}_1 ∧ -b^{1, 151}_0 ∧ true) 
c  in CNF:
c    -b^{1, 151}_2 ∨  b^{1, 151}_1 ∨  b^{1, 151}_0 ∨ false 
c  in DIMACS:
-1613  1614  1615  0

c  3 does not represent an automaton state.
c    -(-b^{1, 151}_2 ∧  b^{1, 151}_1 ∧  b^{1, 151}_0 ∧ true) 
c  in CNF:
c     b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ false 
c  in DIMACS:
 1613 -1614 -1615  0
c  -3 does not represent an automaton state.
c    -( b^{1, 151}_2 ∧  b^{1, 151}_1 ∧  b^{1, 151}_0 ∧ true) 
c  in CNF:
c    -b^{1, 151}_2 ∨ -b^{1, 151}_1 ∨ -b^{1, 151}_0 ∨ false 
c  in DIMACS:
-1613 -1614 -1615  0

c i = 152
c  -2+1 --> -1
c    ( b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧  p_152) -> ( b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0)
c  in CNF:
c    -b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨  b^{1, 153}_2
c    -b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_1
c    -b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨  b^{1, 153}_0
c  in DIMACS:
-1616 -1617  1618 -152  1619 0
-1616 -1617  1618 -152 -1620 0
-1616 -1617  1618 -152  1621 0

c  -1+1 --> 0
c    ( b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0 ∧  p_152) -> (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧ -b^{1, 153}_0)
c  in CNF:
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_2
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_1
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_0
c  in DIMACS:
-1616  1617 -1618 -152 -1619 0
-1616  1617 -1618 -152 -1620 0
-1616  1617 -1618 -152 -1621 0

c  0+1 --> 1
c    (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧  p_152) -> (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0)
c  in CNF:
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_2
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_1
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨  b^{1, 153}_0
c  in DIMACS:
 1616  1617  1618 -152 -1619 0
 1616  1617  1618 -152 -1620 0
 1616  1617  1618 -152  1621 0

c  1+1 --> 2
c    (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0 ∧  p_152) -> (-b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0)
c  in CNF:
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_2
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨  b^{1, 153}_1
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ -p_152 ∨ -b^{1, 153}_0
c  in DIMACS:
 1616  1617 -1618 -152 -1619 0
 1616  1617 -1618 -152  1620 0
 1616  1617 -1618 -152 -1621 0

c  2+1 --> break 
c    (-b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧  p_152) -> break
c  in CNF:
c     b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 1616 -1617  1618 -152 1162 0


c  2-1 --> 1
c    (-b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧ -p_152) -> (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0)
c  in CNF:
c     b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_2
c     b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_1
c     b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨  b^{1, 153}_0
c  in DIMACS:
 1616 -1617  1618  152 -1619 0
 1616 -1617  1618  152 -1620 0
 1616 -1617  1618  152  1621 0

c  1-1 --> 0
c    (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0 ∧ -p_152) -> (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧ -b^{1, 153}_0)
c  in CNF:
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_2
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_1
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_0
c  in DIMACS:
 1616  1617 -1618  152 -1619 0
 1616  1617 -1618  152 -1620 0
 1616  1617 -1618  152 -1621 0

c  0-1 --> -1
c    (-b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧ -p_152) -> ( b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0)
c  in CNF:
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨  b^{1, 153}_2
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_1
c     b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨  b^{1, 153}_0
c  in DIMACS:
 1616  1617  1618  152  1619 0
 1616  1617  1618  152 -1620 0
 1616  1617  1618  152  1621 0

c  -1-1 --> -2
c    ( b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧  b^{1, 152}_0 ∧ -p_152) -> ( b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0)
c  in CNF:
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨  b^{1, 153}_2
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨  b^{1, 153}_1
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨  p_152 ∨ -b^{1, 153}_0
c  in DIMACS:
-1616  1617 -1618  152  1619 0
-1616  1617 -1618  152  1620 0
-1616  1617 -1618  152 -1621 0

c  -2-1 --> break 
c    ( b^{1, 152}_2 ∧  b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨  b^{1, 152}_0 ∨  p_152 ∨ break
c  in DIMACS:
-1616 -1617  1618  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 152}_2 ∧ -b^{1, 152}_1 ∧ -b^{1, 152}_0 ∧ true) 
c  in CNF:
c    -b^{1, 152}_2 ∨  b^{1, 152}_1 ∨  b^{1, 152}_0 ∨ false 
c  in DIMACS:
-1616  1617  1618  0

c  3 does not represent an automaton state.
c    -(-b^{1, 152}_2 ∧  b^{1, 152}_1 ∧  b^{1, 152}_0 ∧ true) 
c  in CNF:
c     b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ false 
c  in DIMACS:
 1616 -1617 -1618  0
c  -3 does not represent an automaton state.
c    -( b^{1, 152}_2 ∧  b^{1, 152}_1 ∧  b^{1, 152}_0 ∧ true) 
c  in CNF:
c    -b^{1, 152}_2 ∨ -b^{1, 152}_1 ∨ -b^{1, 152}_0 ∨ false 
c  in DIMACS:
-1616 -1617 -1618  0

c i = 153
c  -2+1 --> -1
c    ( b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧  p_153) -> ( b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0)
c  in CNF:
c    -b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨  b^{1, 154}_2
c    -b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_1
c    -b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨  b^{1, 154}_0
c  in DIMACS:
-1619 -1620  1621 -153  1622 0
-1619 -1620  1621 -153 -1623 0
-1619 -1620  1621 -153  1624 0

c  -1+1 --> 0
c    ( b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0 ∧  p_153) -> (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧ -b^{1, 154}_0)
c  in CNF:
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_2
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_1
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_0
c  in DIMACS:
-1619  1620 -1621 -153 -1622 0
-1619  1620 -1621 -153 -1623 0
-1619  1620 -1621 -153 -1624 0

c  0+1 --> 1
c    (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧  p_153) -> (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0)
c  in CNF:
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_2
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_1
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨  b^{1, 154}_0
c  in DIMACS:
 1619  1620  1621 -153 -1622 0
 1619  1620  1621 -153 -1623 0
 1619  1620  1621 -153  1624 0

c  1+1 --> 2
c    (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0 ∧  p_153) -> (-b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0)
c  in CNF:
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_2
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨  b^{1, 154}_1
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ -p_153 ∨ -b^{1, 154}_0
c  in DIMACS:
 1619  1620 -1621 -153 -1622 0
 1619  1620 -1621 -153  1623 0
 1619  1620 -1621 -153 -1624 0

c  2+1 --> break 
c    (-b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧  p_153) -> break
c  in CNF:
c     b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 1619 -1620  1621 -153 1162 0


c  2-1 --> 1
c    (-b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧ -p_153) -> (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0)
c  in CNF:
c     b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_2
c     b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_1
c     b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨  b^{1, 154}_0
c  in DIMACS:
 1619 -1620  1621  153 -1622 0
 1619 -1620  1621  153 -1623 0
 1619 -1620  1621  153  1624 0

c  1-1 --> 0
c    (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0 ∧ -p_153) -> (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧ -b^{1, 154}_0)
c  in CNF:
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_2
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_1
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_0
c  in DIMACS:
 1619  1620 -1621  153 -1622 0
 1619  1620 -1621  153 -1623 0
 1619  1620 -1621  153 -1624 0

c  0-1 --> -1
c    (-b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧ -p_153) -> ( b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0)
c  in CNF:
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨  b^{1, 154}_2
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_1
c     b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨  b^{1, 154}_0
c  in DIMACS:
 1619  1620  1621  153  1622 0
 1619  1620  1621  153 -1623 0
 1619  1620  1621  153  1624 0

c  -1-1 --> -2
c    ( b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧  b^{1, 153}_0 ∧ -p_153) -> ( b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0)
c  in CNF:
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨  b^{1, 154}_2
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨  b^{1, 154}_1
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨  p_153 ∨ -b^{1, 154}_0
c  in DIMACS:
-1619  1620 -1621  153  1622 0
-1619  1620 -1621  153  1623 0
-1619  1620 -1621  153 -1624 0

c  -2-1 --> break 
c    ( b^{1, 153}_2 ∧  b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨  b^{1, 153}_0 ∨  p_153 ∨ break
c  in DIMACS:
-1619 -1620  1621  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 153}_2 ∧ -b^{1, 153}_1 ∧ -b^{1, 153}_0 ∧ true) 
c  in CNF:
c    -b^{1, 153}_2 ∨  b^{1, 153}_1 ∨  b^{1, 153}_0 ∨ false 
c  in DIMACS:
-1619  1620  1621  0

c  3 does not represent an automaton state.
c    -(-b^{1, 153}_2 ∧  b^{1, 153}_1 ∧  b^{1, 153}_0 ∧ true) 
c  in CNF:
c     b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ false 
c  in DIMACS:
 1619 -1620 -1621  0
c  -3 does not represent an automaton state.
c    -( b^{1, 153}_2 ∧  b^{1, 153}_1 ∧  b^{1, 153}_0 ∧ true) 
c  in CNF:
c    -b^{1, 153}_2 ∨ -b^{1, 153}_1 ∨ -b^{1, 153}_0 ∨ false 
c  in DIMACS:
-1619 -1620 -1621  0

c i = 154
c  -2+1 --> -1
c    ( b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧  p_154) -> ( b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0)
c  in CNF:
c    -b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨  b^{1, 155}_2
c    -b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_1
c    -b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨  b^{1, 155}_0
c  in DIMACS:
-1622 -1623  1624 -154  1625 0
-1622 -1623  1624 -154 -1626 0
-1622 -1623  1624 -154  1627 0

c  -1+1 --> 0
c    ( b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0 ∧  p_154) -> (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧ -b^{1, 155}_0)
c  in CNF:
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_2
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_1
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_0
c  in DIMACS:
-1622  1623 -1624 -154 -1625 0
-1622  1623 -1624 -154 -1626 0
-1622  1623 -1624 -154 -1627 0

c  0+1 --> 1
c    (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧  p_154) -> (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0)
c  in CNF:
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_2
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_1
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨  b^{1, 155}_0
c  in DIMACS:
 1622  1623  1624 -154 -1625 0
 1622  1623  1624 -154 -1626 0
 1622  1623  1624 -154  1627 0

c  1+1 --> 2
c    (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0 ∧  p_154) -> (-b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0)
c  in CNF:
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_2
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨  b^{1, 155}_1
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ -p_154 ∨ -b^{1, 155}_0
c  in DIMACS:
 1622  1623 -1624 -154 -1625 0
 1622  1623 -1624 -154  1626 0
 1622  1623 -1624 -154 -1627 0

c  2+1 --> break 
c    (-b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧  p_154) -> break
c  in CNF:
c     b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 1622 -1623  1624 -154 1162 0


c  2-1 --> 1
c    (-b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧ -p_154) -> (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0)
c  in CNF:
c     b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_2
c     b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_1
c     b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨  b^{1, 155}_0
c  in DIMACS:
 1622 -1623  1624  154 -1625 0
 1622 -1623  1624  154 -1626 0
 1622 -1623  1624  154  1627 0

c  1-1 --> 0
c    (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0 ∧ -p_154) -> (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧ -b^{1, 155}_0)
c  in CNF:
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_2
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_1
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_0
c  in DIMACS:
 1622  1623 -1624  154 -1625 0
 1622  1623 -1624  154 -1626 0
 1622  1623 -1624  154 -1627 0

c  0-1 --> -1
c    (-b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧ -p_154) -> ( b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0)
c  in CNF:
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨  b^{1, 155}_2
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_1
c     b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨  b^{1, 155}_0
c  in DIMACS:
 1622  1623  1624  154  1625 0
 1622  1623  1624  154 -1626 0
 1622  1623  1624  154  1627 0

c  -1-1 --> -2
c    ( b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧  b^{1, 154}_0 ∧ -p_154) -> ( b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0)
c  in CNF:
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨  b^{1, 155}_2
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨  b^{1, 155}_1
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨  p_154 ∨ -b^{1, 155}_0
c  in DIMACS:
-1622  1623 -1624  154  1625 0
-1622  1623 -1624  154  1626 0
-1622  1623 -1624  154 -1627 0

c  -2-1 --> break 
c    ( b^{1, 154}_2 ∧  b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨  b^{1, 154}_0 ∨  p_154 ∨ break
c  in DIMACS:
-1622 -1623  1624  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 154}_2 ∧ -b^{1, 154}_1 ∧ -b^{1, 154}_0 ∧ true) 
c  in CNF:
c    -b^{1, 154}_2 ∨  b^{1, 154}_1 ∨  b^{1, 154}_0 ∨ false 
c  in DIMACS:
-1622  1623  1624  0

c  3 does not represent an automaton state.
c    -(-b^{1, 154}_2 ∧  b^{1, 154}_1 ∧  b^{1, 154}_0 ∧ true) 
c  in CNF:
c     b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ false 
c  in DIMACS:
 1622 -1623 -1624  0
c  -3 does not represent an automaton state.
c    -( b^{1, 154}_2 ∧  b^{1, 154}_1 ∧  b^{1, 154}_0 ∧ true) 
c  in CNF:
c    -b^{1, 154}_2 ∨ -b^{1, 154}_1 ∨ -b^{1, 154}_0 ∨ false 
c  in DIMACS:
-1622 -1623 -1624  0

c i = 155
c  -2+1 --> -1
c    ( b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧  p_155) -> ( b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0)
c  in CNF:
c    -b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨  b^{1, 156}_2
c    -b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_1
c    -b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨  b^{1, 156}_0
c  in DIMACS:
-1625 -1626  1627 -155  1628 0
-1625 -1626  1627 -155 -1629 0
-1625 -1626  1627 -155  1630 0

c  -1+1 --> 0
c    ( b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0 ∧  p_155) -> (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧ -b^{1, 156}_0)
c  in CNF:
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_2
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_1
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_0
c  in DIMACS:
-1625  1626 -1627 -155 -1628 0
-1625  1626 -1627 -155 -1629 0
-1625  1626 -1627 -155 -1630 0

c  0+1 --> 1
c    (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧  p_155) -> (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0)
c  in CNF:
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_2
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_1
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨  b^{1, 156}_0
c  in DIMACS:
 1625  1626  1627 -155 -1628 0
 1625  1626  1627 -155 -1629 0
 1625  1626  1627 -155  1630 0

c  1+1 --> 2
c    (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0 ∧  p_155) -> (-b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0)
c  in CNF:
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_2
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨  b^{1, 156}_1
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ -p_155 ∨ -b^{1, 156}_0
c  in DIMACS:
 1625  1626 -1627 -155 -1628 0
 1625  1626 -1627 -155  1629 0
 1625  1626 -1627 -155 -1630 0

c  2+1 --> break 
c    (-b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧  p_155) -> break
c  in CNF:
c     b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ -p_155 ∨ break
c  in DIMACS:
 1625 -1626  1627 -155 1162 0


c  2-1 --> 1
c    (-b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧ -p_155) -> (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0)
c  in CNF:
c     b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_2
c     b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_1
c     b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨  b^{1, 156}_0
c  in DIMACS:
 1625 -1626  1627  155 -1628 0
 1625 -1626  1627  155 -1629 0
 1625 -1626  1627  155  1630 0

c  1-1 --> 0
c    (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0 ∧ -p_155) -> (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧ -b^{1, 156}_0)
c  in CNF:
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_2
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_1
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_0
c  in DIMACS:
 1625  1626 -1627  155 -1628 0
 1625  1626 -1627  155 -1629 0
 1625  1626 -1627  155 -1630 0

c  0-1 --> -1
c    (-b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧ -p_155) -> ( b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0)
c  in CNF:
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨  b^{1, 156}_2
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_1
c     b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨  b^{1, 156}_0
c  in DIMACS:
 1625  1626  1627  155  1628 0
 1625  1626  1627  155 -1629 0
 1625  1626  1627  155  1630 0

c  -1-1 --> -2
c    ( b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧  b^{1, 155}_0 ∧ -p_155) -> ( b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0)
c  in CNF:
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨  b^{1, 156}_2
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨  b^{1, 156}_1
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨  p_155 ∨ -b^{1, 156}_0
c  in DIMACS:
-1625  1626 -1627  155  1628 0
-1625  1626 -1627  155  1629 0
-1625  1626 -1627  155 -1630 0

c  -2-1 --> break 
c    ( b^{1, 155}_2 ∧  b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧ -p_155) -> break
c  in CNF:
c    -b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨  b^{1, 155}_0 ∨  p_155 ∨ break
c  in DIMACS:
-1625 -1626  1627  155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 155}_2 ∧ -b^{1, 155}_1 ∧ -b^{1, 155}_0 ∧ true) 
c  in CNF:
c    -b^{1, 155}_2 ∨  b^{1, 155}_1 ∨  b^{1, 155}_0 ∨ false 
c  in DIMACS:
-1625  1626  1627  0

c  3 does not represent an automaton state.
c    -(-b^{1, 155}_2 ∧  b^{1, 155}_1 ∧  b^{1, 155}_0 ∧ true) 
c  in CNF:
c     b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ false 
c  in DIMACS:
 1625 -1626 -1627  0
c  -3 does not represent an automaton state.
c    -( b^{1, 155}_2 ∧  b^{1, 155}_1 ∧  b^{1, 155}_0 ∧ true) 
c  in CNF:
c    -b^{1, 155}_2 ∨ -b^{1, 155}_1 ∨ -b^{1, 155}_0 ∨ false 
c  in DIMACS:
-1625 -1626 -1627  0

c i = 156
c  -2+1 --> -1
c    ( b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧  p_156) -> ( b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0)
c  in CNF:
c    -b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨  b^{1, 157}_2
c    -b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_1
c    -b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨  b^{1, 157}_0
c  in DIMACS:
-1628 -1629  1630 -156  1631 0
-1628 -1629  1630 -156 -1632 0
-1628 -1629  1630 -156  1633 0

c  -1+1 --> 0
c    ( b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0 ∧  p_156) -> (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧ -b^{1, 157}_0)
c  in CNF:
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_2
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_1
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_0
c  in DIMACS:
-1628  1629 -1630 -156 -1631 0
-1628  1629 -1630 -156 -1632 0
-1628  1629 -1630 -156 -1633 0

c  0+1 --> 1
c    (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧  p_156) -> (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0)
c  in CNF:
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_2
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_1
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨  b^{1, 157}_0
c  in DIMACS:
 1628  1629  1630 -156 -1631 0
 1628  1629  1630 -156 -1632 0
 1628  1629  1630 -156  1633 0

c  1+1 --> 2
c    (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0 ∧  p_156) -> (-b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0)
c  in CNF:
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_2
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨  b^{1, 157}_1
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ -p_156 ∨ -b^{1, 157}_0
c  in DIMACS:
 1628  1629 -1630 -156 -1631 0
 1628  1629 -1630 -156  1632 0
 1628  1629 -1630 -156 -1633 0

c  2+1 --> break 
c    (-b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧  p_156) -> break
c  in CNF:
c     b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 1628 -1629  1630 -156 1162 0


c  2-1 --> 1
c    (-b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧ -p_156) -> (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0)
c  in CNF:
c     b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_2
c     b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_1
c     b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨  b^{1, 157}_0
c  in DIMACS:
 1628 -1629  1630  156 -1631 0
 1628 -1629  1630  156 -1632 0
 1628 -1629  1630  156  1633 0

c  1-1 --> 0
c    (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0 ∧ -p_156) -> (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧ -b^{1, 157}_0)
c  in CNF:
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_2
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_1
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_0
c  in DIMACS:
 1628  1629 -1630  156 -1631 0
 1628  1629 -1630  156 -1632 0
 1628  1629 -1630  156 -1633 0

c  0-1 --> -1
c    (-b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧ -p_156) -> ( b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0)
c  in CNF:
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨  b^{1, 157}_2
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_1
c     b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨  b^{1, 157}_0
c  in DIMACS:
 1628  1629  1630  156  1631 0
 1628  1629  1630  156 -1632 0
 1628  1629  1630  156  1633 0

c  -1-1 --> -2
c    ( b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧  b^{1, 156}_0 ∧ -p_156) -> ( b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0)
c  in CNF:
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨  b^{1, 157}_2
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨  b^{1, 157}_1
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨  p_156 ∨ -b^{1, 157}_0
c  in DIMACS:
-1628  1629 -1630  156  1631 0
-1628  1629 -1630  156  1632 0
-1628  1629 -1630  156 -1633 0

c  -2-1 --> break 
c    ( b^{1, 156}_2 ∧  b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨  b^{1, 156}_0 ∨  p_156 ∨ break
c  in DIMACS:
-1628 -1629  1630  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 156}_2 ∧ -b^{1, 156}_1 ∧ -b^{1, 156}_0 ∧ true) 
c  in CNF:
c    -b^{1, 156}_2 ∨  b^{1, 156}_1 ∨  b^{1, 156}_0 ∨ false 
c  in DIMACS:
-1628  1629  1630  0

c  3 does not represent an automaton state.
c    -(-b^{1, 156}_2 ∧  b^{1, 156}_1 ∧  b^{1, 156}_0 ∧ true) 
c  in CNF:
c     b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ false 
c  in DIMACS:
 1628 -1629 -1630  0
c  -3 does not represent an automaton state.
c    -( b^{1, 156}_2 ∧  b^{1, 156}_1 ∧  b^{1, 156}_0 ∧ true) 
c  in CNF:
c    -b^{1, 156}_2 ∨ -b^{1, 156}_1 ∨ -b^{1, 156}_0 ∨ false 
c  in DIMACS:
-1628 -1629 -1630  0

c i = 157
c  -2+1 --> -1
c    ( b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧  p_157) -> ( b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0)
c  in CNF:
c    -b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨  b^{1, 158}_2
c    -b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_1
c    -b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨  b^{1, 158}_0
c  in DIMACS:
-1631 -1632  1633 -157  1634 0
-1631 -1632  1633 -157 -1635 0
-1631 -1632  1633 -157  1636 0

c  -1+1 --> 0
c    ( b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0 ∧  p_157) -> (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧ -b^{1, 158}_0)
c  in CNF:
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_2
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_1
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_0
c  in DIMACS:
-1631  1632 -1633 -157 -1634 0
-1631  1632 -1633 -157 -1635 0
-1631  1632 -1633 -157 -1636 0

c  0+1 --> 1
c    (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧  p_157) -> (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0)
c  in CNF:
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_2
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_1
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨  b^{1, 158}_0
c  in DIMACS:
 1631  1632  1633 -157 -1634 0
 1631  1632  1633 -157 -1635 0
 1631  1632  1633 -157  1636 0

c  1+1 --> 2
c    (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0 ∧  p_157) -> (-b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0)
c  in CNF:
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_2
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨  b^{1, 158}_1
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ -p_157 ∨ -b^{1, 158}_0
c  in DIMACS:
 1631  1632 -1633 -157 -1634 0
 1631  1632 -1633 -157  1635 0
 1631  1632 -1633 -157 -1636 0

c  2+1 --> break 
c    (-b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧  p_157) -> break
c  in CNF:
c     b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ -p_157 ∨ break
c  in DIMACS:
 1631 -1632  1633 -157 1162 0


c  2-1 --> 1
c    (-b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧ -p_157) -> (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0)
c  in CNF:
c     b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_2
c     b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_1
c     b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨  b^{1, 158}_0
c  in DIMACS:
 1631 -1632  1633  157 -1634 0
 1631 -1632  1633  157 -1635 0
 1631 -1632  1633  157  1636 0

c  1-1 --> 0
c    (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0 ∧ -p_157) -> (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧ -b^{1, 158}_0)
c  in CNF:
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_2
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_1
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_0
c  in DIMACS:
 1631  1632 -1633  157 -1634 0
 1631  1632 -1633  157 -1635 0
 1631  1632 -1633  157 -1636 0

c  0-1 --> -1
c    (-b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧ -p_157) -> ( b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0)
c  in CNF:
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨  b^{1, 158}_2
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_1
c     b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨  b^{1, 158}_0
c  in DIMACS:
 1631  1632  1633  157  1634 0
 1631  1632  1633  157 -1635 0
 1631  1632  1633  157  1636 0

c  -1-1 --> -2
c    ( b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧  b^{1, 157}_0 ∧ -p_157) -> ( b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0)
c  in CNF:
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨  b^{1, 158}_2
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨  b^{1, 158}_1
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨  p_157 ∨ -b^{1, 158}_0
c  in DIMACS:
-1631  1632 -1633  157  1634 0
-1631  1632 -1633  157  1635 0
-1631  1632 -1633  157 -1636 0

c  -2-1 --> break 
c    ( b^{1, 157}_2 ∧  b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧ -p_157) -> break
c  in CNF:
c    -b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨  b^{1, 157}_0 ∨  p_157 ∨ break
c  in DIMACS:
-1631 -1632  1633  157 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 157}_2 ∧ -b^{1, 157}_1 ∧ -b^{1, 157}_0 ∧ true) 
c  in CNF:
c    -b^{1, 157}_2 ∨  b^{1, 157}_1 ∨  b^{1, 157}_0 ∨ false 
c  in DIMACS:
-1631  1632  1633  0

c  3 does not represent an automaton state.
c    -(-b^{1, 157}_2 ∧  b^{1, 157}_1 ∧  b^{1, 157}_0 ∧ true) 
c  in CNF:
c     b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ false 
c  in DIMACS:
 1631 -1632 -1633  0
c  -3 does not represent an automaton state.
c    -( b^{1, 157}_2 ∧  b^{1, 157}_1 ∧  b^{1, 157}_0 ∧ true) 
c  in CNF:
c    -b^{1, 157}_2 ∨ -b^{1, 157}_1 ∨ -b^{1, 157}_0 ∨ false 
c  in DIMACS:
-1631 -1632 -1633  0

c i = 158
c  -2+1 --> -1
c    ( b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧  p_158) -> ( b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0)
c  in CNF:
c    -b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨  b^{1, 159}_2
c    -b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_1
c    -b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨  b^{1, 159}_0
c  in DIMACS:
-1634 -1635  1636 -158  1637 0
-1634 -1635  1636 -158 -1638 0
-1634 -1635  1636 -158  1639 0

c  -1+1 --> 0
c    ( b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0 ∧  p_158) -> (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧ -b^{1, 159}_0)
c  in CNF:
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_2
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_1
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_0
c  in DIMACS:
-1634  1635 -1636 -158 -1637 0
-1634  1635 -1636 -158 -1638 0
-1634  1635 -1636 -158 -1639 0

c  0+1 --> 1
c    (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧  p_158) -> (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0)
c  in CNF:
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_2
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_1
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨  b^{1, 159}_0
c  in DIMACS:
 1634  1635  1636 -158 -1637 0
 1634  1635  1636 -158 -1638 0
 1634  1635  1636 -158  1639 0

c  1+1 --> 2
c    (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0 ∧  p_158) -> (-b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0)
c  in CNF:
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_2
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨  b^{1, 159}_1
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ -p_158 ∨ -b^{1, 159}_0
c  in DIMACS:
 1634  1635 -1636 -158 -1637 0
 1634  1635 -1636 -158  1638 0
 1634  1635 -1636 -158 -1639 0

c  2+1 --> break 
c    (-b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧  p_158) -> break
c  in CNF:
c     b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ -p_158 ∨ break
c  in DIMACS:
 1634 -1635  1636 -158 1162 0


c  2-1 --> 1
c    (-b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧ -p_158) -> (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0)
c  in CNF:
c     b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_2
c     b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_1
c     b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨  b^{1, 159}_0
c  in DIMACS:
 1634 -1635  1636  158 -1637 0
 1634 -1635  1636  158 -1638 0
 1634 -1635  1636  158  1639 0

c  1-1 --> 0
c    (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0 ∧ -p_158) -> (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧ -b^{1, 159}_0)
c  in CNF:
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_2
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_1
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_0
c  in DIMACS:
 1634  1635 -1636  158 -1637 0
 1634  1635 -1636  158 -1638 0
 1634  1635 -1636  158 -1639 0

c  0-1 --> -1
c    (-b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧ -p_158) -> ( b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0)
c  in CNF:
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨  b^{1, 159}_2
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_1
c     b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨  b^{1, 159}_0
c  in DIMACS:
 1634  1635  1636  158  1637 0
 1634  1635  1636  158 -1638 0
 1634  1635  1636  158  1639 0

c  -1-1 --> -2
c    ( b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧  b^{1, 158}_0 ∧ -p_158) -> ( b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0)
c  in CNF:
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨  b^{1, 159}_2
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨  b^{1, 159}_1
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨  p_158 ∨ -b^{1, 159}_0
c  in DIMACS:
-1634  1635 -1636  158  1637 0
-1634  1635 -1636  158  1638 0
-1634  1635 -1636  158 -1639 0

c  -2-1 --> break 
c    ( b^{1, 158}_2 ∧  b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧ -p_158) -> break
c  in CNF:
c    -b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨  b^{1, 158}_0 ∨  p_158 ∨ break
c  in DIMACS:
-1634 -1635  1636  158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 158}_2 ∧ -b^{1, 158}_1 ∧ -b^{1, 158}_0 ∧ true) 
c  in CNF:
c    -b^{1, 158}_2 ∨  b^{1, 158}_1 ∨  b^{1, 158}_0 ∨ false 
c  in DIMACS:
-1634  1635  1636  0

c  3 does not represent an automaton state.
c    -(-b^{1, 158}_2 ∧  b^{1, 158}_1 ∧  b^{1, 158}_0 ∧ true) 
c  in CNF:
c     b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ false 
c  in DIMACS:
 1634 -1635 -1636  0
c  -3 does not represent an automaton state.
c    -( b^{1, 158}_2 ∧  b^{1, 158}_1 ∧  b^{1, 158}_0 ∧ true) 
c  in CNF:
c    -b^{1, 158}_2 ∨ -b^{1, 158}_1 ∨ -b^{1, 158}_0 ∨ false 
c  in DIMACS:
-1634 -1635 -1636  0

c i = 159
c  -2+1 --> -1
c    ( b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧  p_159) -> ( b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0)
c  in CNF:
c    -b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨  b^{1, 160}_2
c    -b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_1
c    -b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨  b^{1, 160}_0
c  in DIMACS:
-1637 -1638  1639 -159  1640 0
-1637 -1638  1639 -159 -1641 0
-1637 -1638  1639 -159  1642 0

c  -1+1 --> 0
c    ( b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0 ∧  p_159) -> (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧ -b^{1, 160}_0)
c  in CNF:
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_2
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_1
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_0
c  in DIMACS:
-1637  1638 -1639 -159 -1640 0
-1637  1638 -1639 -159 -1641 0
-1637  1638 -1639 -159 -1642 0

c  0+1 --> 1
c    (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧  p_159) -> (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0)
c  in CNF:
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_2
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_1
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨  b^{1, 160}_0
c  in DIMACS:
 1637  1638  1639 -159 -1640 0
 1637  1638  1639 -159 -1641 0
 1637  1638  1639 -159  1642 0

c  1+1 --> 2
c    (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0 ∧  p_159) -> (-b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0)
c  in CNF:
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_2
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨  b^{1, 160}_1
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ -p_159 ∨ -b^{1, 160}_0
c  in DIMACS:
 1637  1638 -1639 -159 -1640 0
 1637  1638 -1639 -159  1641 0
 1637  1638 -1639 -159 -1642 0

c  2+1 --> break 
c    (-b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧  p_159) -> break
c  in CNF:
c     b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ -p_159 ∨ break
c  in DIMACS:
 1637 -1638  1639 -159 1162 0


c  2-1 --> 1
c    (-b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧ -p_159) -> (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0)
c  in CNF:
c     b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_2
c     b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_1
c     b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨  b^{1, 160}_0
c  in DIMACS:
 1637 -1638  1639  159 -1640 0
 1637 -1638  1639  159 -1641 0
 1637 -1638  1639  159  1642 0

c  1-1 --> 0
c    (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0 ∧ -p_159) -> (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧ -b^{1, 160}_0)
c  in CNF:
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_2
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_1
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_0
c  in DIMACS:
 1637  1638 -1639  159 -1640 0
 1637  1638 -1639  159 -1641 0
 1637  1638 -1639  159 -1642 0

c  0-1 --> -1
c    (-b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧ -p_159) -> ( b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0)
c  in CNF:
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨  b^{1, 160}_2
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_1
c     b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨  b^{1, 160}_0
c  in DIMACS:
 1637  1638  1639  159  1640 0
 1637  1638  1639  159 -1641 0
 1637  1638  1639  159  1642 0

c  -1-1 --> -2
c    ( b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧  b^{1, 159}_0 ∧ -p_159) -> ( b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0)
c  in CNF:
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨  b^{1, 160}_2
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨  b^{1, 160}_1
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨  p_159 ∨ -b^{1, 160}_0
c  in DIMACS:
-1637  1638 -1639  159  1640 0
-1637  1638 -1639  159  1641 0
-1637  1638 -1639  159 -1642 0

c  -2-1 --> break 
c    ( b^{1, 159}_2 ∧  b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧ -p_159) -> break
c  in CNF:
c    -b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨  b^{1, 159}_0 ∨  p_159 ∨ break
c  in DIMACS:
-1637 -1638  1639  159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 159}_2 ∧ -b^{1, 159}_1 ∧ -b^{1, 159}_0 ∧ true) 
c  in CNF:
c    -b^{1, 159}_2 ∨  b^{1, 159}_1 ∨  b^{1, 159}_0 ∨ false 
c  in DIMACS:
-1637  1638  1639  0

c  3 does not represent an automaton state.
c    -(-b^{1, 159}_2 ∧  b^{1, 159}_1 ∧  b^{1, 159}_0 ∧ true) 
c  in CNF:
c     b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ false 
c  in DIMACS:
 1637 -1638 -1639  0
c  -3 does not represent an automaton state.
c    -( b^{1, 159}_2 ∧  b^{1, 159}_1 ∧  b^{1, 159}_0 ∧ true) 
c  in CNF:
c    -b^{1, 159}_2 ∨ -b^{1, 159}_1 ∨ -b^{1, 159}_0 ∨ false 
c  in DIMACS:
-1637 -1638 -1639  0

c i = 160
c  -2+1 --> -1
c    ( b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧  p_160) -> ( b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0)
c  in CNF:
c    -b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨  b^{1, 161}_2
c    -b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_1
c    -b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨  b^{1, 161}_0
c  in DIMACS:
-1640 -1641  1642 -160  1643 0
-1640 -1641  1642 -160 -1644 0
-1640 -1641  1642 -160  1645 0

c  -1+1 --> 0
c    ( b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0 ∧  p_160) -> (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧ -b^{1, 161}_0)
c  in CNF:
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_2
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_1
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_0
c  in DIMACS:
-1640  1641 -1642 -160 -1643 0
-1640  1641 -1642 -160 -1644 0
-1640  1641 -1642 -160 -1645 0

c  0+1 --> 1
c    (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧  p_160) -> (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0)
c  in CNF:
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_2
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_1
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨  b^{1, 161}_0
c  in DIMACS:
 1640  1641  1642 -160 -1643 0
 1640  1641  1642 -160 -1644 0
 1640  1641  1642 -160  1645 0

c  1+1 --> 2
c    (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0 ∧  p_160) -> (-b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0)
c  in CNF:
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_2
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨  b^{1, 161}_1
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ -p_160 ∨ -b^{1, 161}_0
c  in DIMACS:
 1640  1641 -1642 -160 -1643 0
 1640  1641 -1642 -160  1644 0
 1640  1641 -1642 -160 -1645 0

c  2+1 --> break 
c    (-b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧  p_160) -> break
c  in CNF:
c     b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 1640 -1641  1642 -160 1162 0


c  2-1 --> 1
c    (-b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧ -p_160) -> (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0)
c  in CNF:
c     b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_2
c     b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_1
c     b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨  b^{1, 161}_0
c  in DIMACS:
 1640 -1641  1642  160 -1643 0
 1640 -1641  1642  160 -1644 0
 1640 -1641  1642  160  1645 0

c  1-1 --> 0
c    (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0 ∧ -p_160) -> (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧ -b^{1, 161}_0)
c  in CNF:
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_2
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_1
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_0
c  in DIMACS:
 1640  1641 -1642  160 -1643 0
 1640  1641 -1642  160 -1644 0
 1640  1641 -1642  160 -1645 0

c  0-1 --> -1
c    (-b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧ -p_160) -> ( b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0)
c  in CNF:
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨  b^{1, 161}_2
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_1
c     b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨  b^{1, 161}_0
c  in DIMACS:
 1640  1641  1642  160  1643 0
 1640  1641  1642  160 -1644 0
 1640  1641  1642  160  1645 0

c  -1-1 --> -2
c    ( b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧  b^{1, 160}_0 ∧ -p_160) -> ( b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0)
c  in CNF:
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨  b^{1, 161}_2
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨  b^{1, 161}_1
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨  p_160 ∨ -b^{1, 161}_0
c  in DIMACS:
-1640  1641 -1642  160  1643 0
-1640  1641 -1642  160  1644 0
-1640  1641 -1642  160 -1645 0

c  -2-1 --> break 
c    ( b^{1, 160}_2 ∧  b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨  b^{1, 160}_0 ∨  p_160 ∨ break
c  in DIMACS:
-1640 -1641  1642  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 160}_2 ∧ -b^{1, 160}_1 ∧ -b^{1, 160}_0 ∧ true) 
c  in CNF:
c    -b^{1, 160}_2 ∨  b^{1, 160}_1 ∨  b^{1, 160}_0 ∨ false 
c  in DIMACS:
-1640  1641  1642  0

c  3 does not represent an automaton state.
c    -(-b^{1, 160}_2 ∧  b^{1, 160}_1 ∧  b^{1, 160}_0 ∧ true) 
c  in CNF:
c     b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ false 
c  in DIMACS:
 1640 -1641 -1642  0
c  -3 does not represent an automaton state.
c    -( b^{1, 160}_2 ∧  b^{1, 160}_1 ∧  b^{1, 160}_0 ∧ true) 
c  in CNF:
c    -b^{1, 160}_2 ∨ -b^{1, 160}_1 ∨ -b^{1, 160}_0 ∨ false 
c  in DIMACS:
-1640 -1641 -1642  0

c i = 161
c  -2+1 --> -1
c    ( b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧  p_161) -> ( b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0)
c  in CNF:
c    -b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨  b^{1, 162}_2
c    -b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_1
c    -b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨  b^{1, 162}_0
c  in DIMACS:
-1643 -1644  1645 -161  1646 0
-1643 -1644  1645 -161 -1647 0
-1643 -1644  1645 -161  1648 0

c  -1+1 --> 0
c    ( b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0 ∧  p_161) -> (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧ -b^{1, 162}_0)
c  in CNF:
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_2
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_1
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_0
c  in DIMACS:
-1643  1644 -1645 -161 -1646 0
-1643  1644 -1645 -161 -1647 0
-1643  1644 -1645 -161 -1648 0

c  0+1 --> 1
c    (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧  p_161) -> (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0)
c  in CNF:
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_2
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_1
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨  b^{1, 162}_0
c  in DIMACS:
 1643  1644  1645 -161 -1646 0
 1643  1644  1645 -161 -1647 0
 1643  1644  1645 -161  1648 0

c  1+1 --> 2
c    (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0 ∧  p_161) -> (-b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0)
c  in CNF:
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_2
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨  b^{1, 162}_1
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ -p_161 ∨ -b^{1, 162}_0
c  in DIMACS:
 1643  1644 -1645 -161 -1646 0
 1643  1644 -1645 -161  1647 0
 1643  1644 -1645 -161 -1648 0

c  2+1 --> break 
c    (-b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧  p_161) -> break
c  in CNF:
c     b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ -p_161 ∨ break
c  in DIMACS:
 1643 -1644  1645 -161 1162 0


c  2-1 --> 1
c    (-b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧ -p_161) -> (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0)
c  in CNF:
c     b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_2
c     b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_1
c     b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨  b^{1, 162}_0
c  in DIMACS:
 1643 -1644  1645  161 -1646 0
 1643 -1644  1645  161 -1647 0
 1643 -1644  1645  161  1648 0

c  1-1 --> 0
c    (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0 ∧ -p_161) -> (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧ -b^{1, 162}_0)
c  in CNF:
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_2
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_1
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_0
c  in DIMACS:
 1643  1644 -1645  161 -1646 0
 1643  1644 -1645  161 -1647 0
 1643  1644 -1645  161 -1648 0

c  0-1 --> -1
c    (-b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧ -p_161) -> ( b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0)
c  in CNF:
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨  b^{1, 162}_2
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_1
c     b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨  b^{1, 162}_0
c  in DIMACS:
 1643  1644  1645  161  1646 0
 1643  1644  1645  161 -1647 0
 1643  1644  1645  161  1648 0

c  -1-1 --> -2
c    ( b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧  b^{1, 161}_0 ∧ -p_161) -> ( b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0)
c  in CNF:
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨  b^{1, 162}_2
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨  b^{1, 162}_1
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨  p_161 ∨ -b^{1, 162}_0
c  in DIMACS:
-1643  1644 -1645  161  1646 0
-1643  1644 -1645  161  1647 0
-1643  1644 -1645  161 -1648 0

c  -2-1 --> break 
c    ( b^{1, 161}_2 ∧  b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧ -p_161) -> break
c  in CNF:
c    -b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨  b^{1, 161}_0 ∨  p_161 ∨ break
c  in DIMACS:
-1643 -1644  1645  161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 161}_2 ∧ -b^{1, 161}_1 ∧ -b^{1, 161}_0 ∧ true) 
c  in CNF:
c    -b^{1, 161}_2 ∨  b^{1, 161}_1 ∨  b^{1, 161}_0 ∨ false 
c  in DIMACS:
-1643  1644  1645  0

c  3 does not represent an automaton state.
c    -(-b^{1, 161}_2 ∧  b^{1, 161}_1 ∧  b^{1, 161}_0 ∧ true) 
c  in CNF:
c     b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ false 
c  in DIMACS:
 1643 -1644 -1645  0
c  -3 does not represent an automaton state.
c    -( b^{1, 161}_2 ∧  b^{1, 161}_1 ∧  b^{1, 161}_0 ∧ true) 
c  in CNF:
c    -b^{1, 161}_2 ∨ -b^{1, 161}_1 ∨ -b^{1, 161}_0 ∨ false 
c  in DIMACS:
-1643 -1644 -1645  0

c i = 162
c  -2+1 --> -1
c    ( b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧  p_162) -> ( b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0)
c  in CNF:
c    -b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨  b^{1, 163}_2
c    -b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_1
c    -b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨  b^{1, 163}_0
c  in DIMACS:
-1646 -1647  1648 -162  1649 0
-1646 -1647  1648 -162 -1650 0
-1646 -1647  1648 -162  1651 0

c  -1+1 --> 0
c    ( b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0 ∧  p_162) -> (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧ -b^{1, 163}_0)
c  in CNF:
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_2
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_1
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_0
c  in DIMACS:
-1646  1647 -1648 -162 -1649 0
-1646  1647 -1648 -162 -1650 0
-1646  1647 -1648 -162 -1651 0

c  0+1 --> 1
c    (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧  p_162) -> (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0)
c  in CNF:
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_2
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_1
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨  b^{1, 163}_0
c  in DIMACS:
 1646  1647  1648 -162 -1649 0
 1646  1647  1648 -162 -1650 0
 1646  1647  1648 -162  1651 0

c  1+1 --> 2
c    (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0 ∧  p_162) -> (-b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0)
c  in CNF:
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_2
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨  b^{1, 163}_1
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ -p_162 ∨ -b^{1, 163}_0
c  in DIMACS:
 1646  1647 -1648 -162 -1649 0
 1646  1647 -1648 -162  1650 0
 1646  1647 -1648 -162 -1651 0

c  2+1 --> break 
c    (-b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧  p_162) -> break
c  in CNF:
c     b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 1646 -1647  1648 -162 1162 0


c  2-1 --> 1
c    (-b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧ -p_162) -> (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0)
c  in CNF:
c     b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_2
c     b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_1
c     b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨  b^{1, 163}_0
c  in DIMACS:
 1646 -1647  1648  162 -1649 0
 1646 -1647  1648  162 -1650 0
 1646 -1647  1648  162  1651 0

c  1-1 --> 0
c    (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0 ∧ -p_162) -> (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧ -b^{1, 163}_0)
c  in CNF:
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_2
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_1
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_0
c  in DIMACS:
 1646  1647 -1648  162 -1649 0
 1646  1647 -1648  162 -1650 0
 1646  1647 -1648  162 -1651 0

c  0-1 --> -1
c    (-b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧ -p_162) -> ( b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0)
c  in CNF:
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨  b^{1, 163}_2
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_1
c     b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨  b^{1, 163}_0
c  in DIMACS:
 1646  1647  1648  162  1649 0
 1646  1647  1648  162 -1650 0
 1646  1647  1648  162  1651 0

c  -1-1 --> -2
c    ( b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧  b^{1, 162}_0 ∧ -p_162) -> ( b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0)
c  in CNF:
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨  b^{1, 163}_2
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨  b^{1, 163}_1
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨  p_162 ∨ -b^{1, 163}_0
c  in DIMACS:
-1646  1647 -1648  162  1649 0
-1646  1647 -1648  162  1650 0
-1646  1647 -1648  162 -1651 0

c  -2-1 --> break 
c    ( b^{1, 162}_2 ∧  b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨  b^{1, 162}_0 ∨  p_162 ∨ break
c  in DIMACS:
-1646 -1647  1648  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 162}_2 ∧ -b^{1, 162}_1 ∧ -b^{1, 162}_0 ∧ true) 
c  in CNF:
c    -b^{1, 162}_2 ∨  b^{1, 162}_1 ∨  b^{1, 162}_0 ∨ false 
c  in DIMACS:
-1646  1647  1648  0

c  3 does not represent an automaton state.
c    -(-b^{1, 162}_2 ∧  b^{1, 162}_1 ∧  b^{1, 162}_0 ∧ true) 
c  in CNF:
c     b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ false 
c  in DIMACS:
 1646 -1647 -1648  0
c  -3 does not represent an automaton state.
c    -( b^{1, 162}_2 ∧  b^{1, 162}_1 ∧  b^{1, 162}_0 ∧ true) 
c  in CNF:
c    -b^{1, 162}_2 ∨ -b^{1, 162}_1 ∨ -b^{1, 162}_0 ∨ false 
c  in DIMACS:
-1646 -1647 -1648  0

c i = 163
c  -2+1 --> -1
c    ( b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧  p_163) -> ( b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0)
c  in CNF:
c    -b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨  b^{1, 164}_2
c    -b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_1
c    -b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨  b^{1, 164}_0
c  in DIMACS:
-1649 -1650  1651 -163  1652 0
-1649 -1650  1651 -163 -1653 0
-1649 -1650  1651 -163  1654 0

c  -1+1 --> 0
c    ( b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0 ∧  p_163) -> (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧ -b^{1, 164}_0)
c  in CNF:
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_2
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_1
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_0
c  in DIMACS:
-1649  1650 -1651 -163 -1652 0
-1649  1650 -1651 -163 -1653 0
-1649  1650 -1651 -163 -1654 0

c  0+1 --> 1
c    (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧  p_163) -> (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0)
c  in CNF:
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_2
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_1
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨  b^{1, 164}_0
c  in DIMACS:
 1649  1650  1651 -163 -1652 0
 1649  1650  1651 -163 -1653 0
 1649  1650  1651 -163  1654 0

c  1+1 --> 2
c    (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0 ∧  p_163) -> (-b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0)
c  in CNF:
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_2
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨  b^{1, 164}_1
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ -p_163 ∨ -b^{1, 164}_0
c  in DIMACS:
 1649  1650 -1651 -163 -1652 0
 1649  1650 -1651 -163  1653 0
 1649  1650 -1651 -163 -1654 0

c  2+1 --> break 
c    (-b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧  p_163) -> break
c  in CNF:
c     b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ -p_163 ∨ break
c  in DIMACS:
 1649 -1650  1651 -163 1162 0


c  2-1 --> 1
c    (-b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧ -p_163) -> (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0)
c  in CNF:
c     b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_2
c     b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_1
c     b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨  b^{1, 164}_0
c  in DIMACS:
 1649 -1650  1651  163 -1652 0
 1649 -1650  1651  163 -1653 0
 1649 -1650  1651  163  1654 0

c  1-1 --> 0
c    (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0 ∧ -p_163) -> (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧ -b^{1, 164}_0)
c  in CNF:
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_2
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_1
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_0
c  in DIMACS:
 1649  1650 -1651  163 -1652 0
 1649  1650 -1651  163 -1653 0
 1649  1650 -1651  163 -1654 0

c  0-1 --> -1
c    (-b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧ -p_163) -> ( b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0)
c  in CNF:
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨  b^{1, 164}_2
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_1
c     b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨  b^{1, 164}_0
c  in DIMACS:
 1649  1650  1651  163  1652 0
 1649  1650  1651  163 -1653 0
 1649  1650  1651  163  1654 0

c  -1-1 --> -2
c    ( b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧  b^{1, 163}_0 ∧ -p_163) -> ( b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0)
c  in CNF:
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨  b^{1, 164}_2
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨  b^{1, 164}_1
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨  p_163 ∨ -b^{1, 164}_0
c  in DIMACS:
-1649  1650 -1651  163  1652 0
-1649  1650 -1651  163  1653 0
-1649  1650 -1651  163 -1654 0

c  -2-1 --> break 
c    ( b^{1, 163}_2 ∧  b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧ -p_163) -> break
c  in CNF:
c    -b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨  b^{1, 163}_0 ∨  p_163 ∨ break
c  in DIMACS:
-1649 -1650  1651  163 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 163}_2 ∧ -b^{1, 163}_1 ∧ -b^{1, 163}_0 ∧ true) 
c  in CNF:
c    -b^{1, 163}_2 ∨  b^{1, 163}_1 ∨  b^{1, 163}_0 ∨ false 
c  in DIMACS:
-1649  1650  1651  0

c  3 does not represent an automaton state.
c    -(-b^{1, 163}_2 ∧  b^{1, 163}_1 ∧  b^{1, 163}_0 ∧ true) 
c  in CNF:
c     b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ false 
c  in DIMACS:
 1649 -1650 -1651  0
c  -3 does not represent an automaton state.
c    -( b^{1, 163}_2 ∧  b^{1, 163}_1 ∧  b^{1, 163}_0 ∧ true) 
c  in CNF:
c    -b^{1, 163}_2 ∨ -b^{1, 163}_1 ∨ -b^{1, 163}_0 ∨ false 
c  in DIMACS:
-1649 -1650 -1651  0

c i = 164
c  -2+1 --> -1
c    ( b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧  p_164) -> ( b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0)
c  in CNF:
c    -b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨  b^{1, 165}_2
c    -b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_1
c    -b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨  b^{1, 165}_0
c  in DIMACS:
-1652 -1653  1654 -164  1655 0
-1652 -1653  1654 -164 -1656 0
-1652 -1653  1654 -164  1657 0

c  -1+1 --> 0
c    ( b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0 ∧  p_164) -> (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧ -b^{1, 165}_0)
c  in CNF:
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_2
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_1
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_0
c  in DIMACS:
-1652  1653 -1654 -164 -1655 0
-1652  1653 -1654 -164 -1656 0
-1652  1653 -1654 -164 -1657 0

c  0+1 --> 1
c    (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧  p_164) -> (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0)
c  in CNF:
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_2
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_1
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨  b^{1, 165}_0
c  in DIMACS:
 1652  1653  1654 -164 -1655 0
 1652  1653  1654 -164 -1656 0
 1652  1653  1654 -164  1657 0

c  1+1 --> 2
c    (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0 ∧  p_164) -> (-b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0)
c  in CNF:
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_2
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨  b^{1, 165}_1
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ -p_164 ∨ -b^{1, 165}_0
c  in DIMACS:
 1652  1653 -1654 -164 -1655 0
 1652  1653 -1654 -164  1656 0
 1652  1653 -1654 -164 -1657 0

c  2+1 --> break 
c    (-b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧  p_164) -> break
c  in CNF:
c     b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 1652 -1653  1654 -164 1162 0


c  2-1 --> 1
c    (-b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧ -p_164) -> (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0)
c  in CNF:
c     b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_2
c     b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_1
c     b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨  b^{1, 165}_0
c  in DIMACS:
 1652 -1653  1654  164 -1655 0
 1652 -1653  1654  164 -1656 0
 1652 -1653  1654  164  1657 0

c  1-1 --> 0
c    (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0 ∧ -p_164) -> (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧ -b^{1, 165}_0)
c  in CNF:
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_2
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_1
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_0
c  in DIMACS:
 1652  1653 -1654  164 -1655 0
 1652  1653 -1654  164 -1656 0
 1652  1653 -1654  164 -1657 0

c  0-1 --> -1
c    (-b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧ -p_164) -> ( b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0)
c  in CNF:
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨  b^{1, 165}_2
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_1
c     b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨  b^{1, 165}_0
c  in DIMACS:
 1652  1653  1654  164  1655 0
 1652  1653  1654  164 -1656 0
 1652  1653  1654  164  1657 0

c  -1-1 --> -2
c    ( b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧  b^{1, 164}_0 ∧ -p_164) -> ( b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0)
c  in CNF:
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨  b^{1, 165}_2
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨  b^{1, 165}_1
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨  p_164 ∨ -b^{1, 165}_0
c  in DIMACS:
-1652  1653 -1654  164  1655 0
-1652  1653 -1654  164  1656 0
-1652  1653 -1654  164 -1657 0

c  -2-1 --> break 
c    ( b^{1, 164}_2 ∧  b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨  b^{1, 164}_0 ∨  p_164 ∨ break
c  in DIMACS:
-1652 -1653  1654  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 164}_2 ∧ -b^{1, 164}_1 ∧ -b^{1, 164}_0 ∧ true) 
c  in CNF:
c    -b^{1, 164}_2 ∨  b^{1, 164}_1 ∨  b^{1, 164}_0 ∨ false 
c  in DIMACS:
-1652  1653  1654  0

c  3 does not represent an automaton state.
c    -(-b^{1, 164}_2 ∧  b^{1, 164}_1 ∧  b^{1, 164}_0 ∧ true) 
c  in CNF:
c     b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ false 
c  in DIMACS:
 1652 -1653 -1654  0
c  -3 does not represent an automaton state.
c    -( b^{1, 164}_2 ∧  b^{1, 164}_1 ∧  b^{1, 164}_0 ∧ true) 
c  in CNF:
c    -b^{1, 164}_2 ∨ -b^{1, 164}_1 ∨ -b^{1, 164}_0 ∨ false 
c  in DIMACS:
-1652 -1653 -1654  0

c i = 165
c  -2+1 --> -1
c    ( b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧  p_165) -> ( b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0)
c  in CNF:
c    -b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨  b^{1, 166}_2
c    -b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_1
c    -b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨  b^{1, 166}_0
c  in DIMACS:
-1655 -1656  1657 -165  1658 0
-1655 -1656  1657 -165 -1659 0
-1655 -1656  1657 -165  1660 0

c  -1+1 --> 0
c    ( b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0 ∧  p_165) -> (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧ -b^{1, 166}_0)
c  in CNF:
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_2
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_1
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_0
c  in DIMACS:
-1655  1656 -1657 -165 -1658 0
-1655  1656 -1657 -165 -1659 0
-1655  1656 -1657 -165 -1660 0

c  0+1 --> 1
c    (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧  p_165) -> (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0)
c  in CNF:
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_2
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_1
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨  b^{1, 166}_0
c  in DIMACS:
 1655  1656  1657 -165 -1658 0
 1655  1656  1657 -165 -1659 0
 1655  1656  1657 -165  1660 0

c  1+1 --> 2
c    (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0 ∧  p_165) -> (-b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0)
c  in CNF:
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_2
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨  b^{1, 166}_1
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ -p_165 ∨ -b^{1, 166}_0
c  in DIMACS:
 1655  1656 -1657 -165 -1658 0
 1655  1656 -1657 -165  1659 0
 1655  1656 -1657 -165 -1660 0

c  2+1 --> break 
c    (-b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧  p_165) -> break
c  in CNF:
c     b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 1655 -1656  1657 -165 1162 0


c  2-1 --> 1
c    (-b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧ -p_165) -> (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0)
c  in CNF:
c     b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_2
c     b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_1
c     b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨  b^{1, 166}_0
c  in DIMACS:
 1655 -1656  1657  165 -1658 0
 1655 -1656  1657  165 -1659 0
 1655 -1656  1657  165  1660 0

c  1-1 --> 0
c    (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0 ∧ -p_165) -> (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧ -b^{1, 166}_0)
c  in CNF:
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_2
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_1
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_0
c  in DIMACS:
 1655  1656 -1657  165 -1658 0
 1655  1656 -1657  165 -1659 0
 1655  1656 -1657  165 -1660 0

c  0-1 --> -1
c    (-b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧ -p_165) -> ( b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0)
c  in CNF:
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨  b^{1, 166}_2
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_1
c     b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨  b^{1, 166}_0
c  in DIMACS:
 1655  1656  1657  165  1658 0
 1655  1656  1657  165 -1659 0
 1655  1656  1657  165  1660 0

c  -1-1 --> -2
c    ( b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧  b^{1, 165}_0 ∧ -p_165) -> ( b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0)
c  in CNF:
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨  b^{1, 166}_2
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨  b^{1, 166}_1
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨  p_165 ∨ -b^{1, 166}_0
c  in DIMACS:
-1655  1656 -1657  165  1658 0
-1655  1656 -1657  165  1659 0
-1655  1656 -1657  165 -1660 0

c  -2-1 --> break 
c    ( b^{1, 165}_2 ∧  b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨  b^{1, 165}_0 ∨  p_165 ∨ break
c  in DIMACS:
-1655 -1656  1657  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 165}_2 ∧ -b^{1, 165}_1 ∧ -b^{1, 165}_0 ∧ true) 
c  in CNF:
c    -b^{1, 165}_2 ∨  b^{1, 165}_1 ∨  b^{1, 165}_0 ∨ false 
c  in DIMACS:
-1655  1656  1657  0

c  3 does not represent an automaton state.
c    -(-b^{1, 165}_2 ∧  b^{1, 165}_1 ∧  b^{1, 165}_0 ∧ true) 
c  in CNF:
c     b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ false 
c  in DIMACS:
 1655 -1656 -1657  0
c  -3 does not represent an automaton state.
c    -( b^{1, 165}_2 ∧  b^{1, 165}_1 ∧  b^{1, 165}_0 ∧ true) 
c  in CNF:
c    -b^{1, 165}_2 ∨ -b^{1, 165}_1 ∨ -b^{1, 165}_0 ∨ false 
c  in DIMACS:
-1655 -1656 -1657  0

c i = 166
c  -2+1 --> -1
c    ( b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧  p_166) -> ( b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0)
c  in CNF:
c    -b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨  b^{1, 167}_2
c    -b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_1
c    -b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨  b^{1, 167}_0
c  in DIMACS:
-1658 -1659  1660 -166  1661 0
-1658 -1659  1660 -166 -1662 0
-1658 -1659  1660 -166  1663 0

c  -1+1 --> 0
c    ( b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0 ∧  p_166) -> (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧ -b^{1, 167}_0)
c  in CNF:
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_2
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_1
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_0
c  in DIMACS:
-1658  1659 -1660 -166 -1661 0
-1658  1659 -1660 -166 -1662 0
-1658  1659 -1660 -166 -1663 0

c  0+1 --> 1
c    (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧  p_166) -> (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0)
c  in CNF:
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_2
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_1
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨  b^{1, 167}_0
c  in DIMACS:
 1658  1659  1660 -166 -1661 0
 1658  1659  1660 -166 -1662 0
 1658  1659  1660 -166  1663 0

c  1+1 --> 2
c    (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0 ∧  p_166) -> (-b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0)
c  in CNF:
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_2
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨  b^{1, 167}_1
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ -p_166 ∨ -b^{1, 167}_0
c  in DIMACS:
 1658  1659 -1660 -166 -1661 0
 1658  1659 -1660 -166  1662 0
 1658  1659 -1660 -166 -1663 0

c  2+1 --> break 
c    (-b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧  p_166) -> break
c  in CNF:
c     b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ -p_166 ∨ break
c  in DIMACS:
 1658 -1659  1660 -166 1162 0


c  2-1 --> 1
c    (-b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧ -p_166) -> (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0)
c  in CNF:
c     b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_2
c     b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_1
c     b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨  b^{1, 167}_0
c  in DIMACS:
 1658 -1659  1660  166 -1661 0
 1658 -1659  1660  166 -1662 0
 1658 -1659  1660  166  1663 0

c  1-1 --> 0
c    (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0 ∧ -p_166) -> (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧ -b^{1, 167}_0)
c  in CNF:
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_2
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_1
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_0
c  in DIMACS:
 1658  1659 -1660  166 -1661 0
 1658  1659 -1660  166 -1662 0
 1658  1659 -1660  166 -1663 0

c  0-1 --> -1
c    (-b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧ -p_166) -> ( b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0)
c  in CNF:
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨  b^{1, 167}_2
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_1
c     b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨  b^{1, 167}_0
c  in DIMACS:
 1658  1659  1660  166  1661 0
 1658  1659  1660  166 -1662 0
 1658  1659  1660  166  1663 0

c  -1-1 --> -2
c    ( b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧  b^{1, 166}_0 ∧ -p_166) -> ( b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0)
c  in CNF:
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨  b^{1, 167}_2
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨  b^{1, 167}_1
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨  p_166 ∨ -b^{1, 167}_0
c  in DIMACS:
-1658  1659 -1660  166  1661 0
-1658  1659 -1660  166  1662 0
-1658  1659 -1660  166 -1663 0

c  -2-1 --> break 
c    ( b^{1, 166}_2 ∧  b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧ -p_166) -> break
c  in CNF:
c    -b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨  b^{1, 166}_0 ∨  p_166 ∨ break
c  in DIMACS:
-1658 -1659  1660  166 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 166}_2 ∧ -b^{1, 166}_1 ∧ -b^{1, 166}_0 ∧ true) 
c  in CNF:
c    -b^{1, 166}_2 ∨  b^{1, 166}_1 ∨  b^{1, 166}_0 ∨ false 
c  in DIMACS:
-1658  1659  1660  0

c  3 does not represent an automaton state.
c    -(-b^{1, 166}_2 ∧  b^{1, 166}_1 ∧  b^{1, 166}_0 ∧ true) 
c  in CNF:
c     b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ false 
c  in DIMACS:
 1658 -1659 -1660  0
c  -3 does not represent an automaton state.
c    -( b^{1, 166}_2 ∧  b^{1, 166}_1 ∧  b^{1, 166}_0 ∧ true) 
c  in CNF:
c    -b^{1, 166}_2 ∨ -b^{1, 166}_1 ∨ -b^{1, 166}_0 ∨ false 
c  in DIMACS:
-1658 -1659 -1660  0

c i = 167
c  -2+1 --> -1
c    ( b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧  p_167) -> ( b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0)
c  in CNF:
c    -b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨  b^{1, 168}_2
c    -b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_1
c    -b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨  b^{1, 168}_0
c  in DIMACS:
-1661 -1662  1663 -167  1664 0
-1661 -1662  1663 -167 -1665 0
-1661 -1662  1663 -167  1666 0

c  -1+1 --> 0
c    ( b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0 ∧  p_167) -> (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧ -b^{1, 168}_0)
c  in CNF:
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_2
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_1
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_0
c  in DIMACS:
-1661  1662 -1663 -167 -1664 0
-1661  1662 -1663 -167 -1665 0
-1661  1662 -1663 -167 -1666 0

c  0+1 --> 1
c    (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧  p_167) -> (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0)
c  in CNF:
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_2
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_1
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨  b^{1, 168}_0
c  in DIMACS:
 1661  1662  1663 -167 -1664 0
 1661  1662  1663 -167 -1665 0
 1661  1662  1663 -167  1666 0

c  1+1 --> 2
c    (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0 ∧  p_167) -> (-b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0)
c  in CNF:
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_2
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨  b^{1, 168}_1
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ -p_167 ∨ -b^{1, 168}_0
c  in DIMACS:
 1661  1662 -1663 -167 -1664 0
 1661  1662 -1663 -167  1665 0
 1661  1662 -1663 -167 -1666 0

c  2+1 --> break 
c    (-b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧  p_167) -> break
c  in CNF:
c     b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ -p_167 ∨ break
c  in DIMACS:
 1661 -1662  1663 -167 1162 0


c  2-1 --> 1
c    (-b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧ -p_167) -> (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0)
c  in CNF:
c     b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_2
c     b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_1
c     b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨  b^{1, 168}_0
c  in DIMACS:
 1661 -1662  1663  167 -1664 0
 1661 -1662  1663  167 -1665 0
 1661 -1662  1663  167  1666 0

c  1-1 --> 0
c    (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0 ∧ -p_167) -> (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧ -b^{1, 168}_0)
c  in CNF:
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_2
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_1
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_0
c  in DIMACS:
 1661  1662 -1663  167 -1664 0
 1661  1662 -1663  167 -1665 0
 1661  1662 -1663  167 -1666 0

c  0-1 --> -1
c    (-b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧ -p_167) -> ( b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0)
c  in CNF:
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨  b^{1, 168}_2
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_1
c     b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨  b^{1, 168}_0
c  in DIMACS:
 1661  1662  1663  167  1664 0
 1661  1662  1663  167 -1665 0
 1661  1662  1663  167  1666 0

c  -1-1 --> -2
c    ( b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧  b^{1, 167}_0 ∧ -p_167) -> ( b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0)
c  in CNF:
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨  b^{1, 168}_2
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨  b^{1, 168}_1
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨  p_167 ∨ -b^{1, 168}_0
c  in DIMACS:
-1661  1662 -1663  167  1664 0
-1661  1662 -1663  167  1665 0
-1661  1662 -1663  167 -1666 0

c  -2-1 --> break 
c    ( b^{1, 167}_2 ∧  b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧ -p_167) -> break
c  in CNF:
c    -b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨  b^{1, 167}_0 ∨  p_167 ∨ break
c  in DIMACS:
-1661 -1662  1663  167 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 167}_2 ∧ -b^{1, 167}_1 ∧ -b^{1, 167}_0 ∧ true) 
c  in CNF:
c    -b^{1, 167}_2 ∨  b^{1, 167}_1 ∨  b^{1, 167}_0 ∨ false 
c  in DIMACS:
-1661  1662  1663  0

c  3 does not represent an automaton state.
c    -(-b^{1, 167}_2 ∧  b^{1, 167}_1 ∧  b^{1, 167}_0 ∧ true) 
c  in CNF:
c     b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ false 
c  in DIMACS:
 1661 -1662 -1663  0
c  -3 does not represent an automaton state.
c    -( b^{1, 167}_2 ∧  b^{1, 167}_1 ∧  b^{1, 167}_0 ∧ true) 
c  in CNF:
c    -b^{1, 167}_2 ∨ -b^{1, 167}_1 ∨ -b^{1, 167}_0 ∨ false 
c  in DIMACS:
-1661 -1662 -1663  0

c i = 168
c  -2+1 --> -1
c    ( b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧  p_168) -> ( b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0)
c  in CNF:
c    -b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨  b^{1, 169}_2
c    -b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_1
c    -b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨  b^{1, 169}_0
c  in DIMACS:
-1664 -1665  1666 -168  1667 0
-1664 -1665  1666 -168 -1668 0
-1664 -1665  1666 -168  1669 0

c  -1+1 --> 0
c    ( b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0 ∧  p_168) -> (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧ -b^{1, 169}_0)
c  in CNF:
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_2
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_1
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_0
c  in DIMACS:
-1664  1665 -1666 -168 -1667 0
-1664  1665 -1666 -168 -1668 0
-1664  1665 -1666 -168 -1669 0

c  0+1 --> 1
c    (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧  p_168) -> (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0)
c  in CNF:
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_2
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_1
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨  b^{1, 169}_0
c  in DIMACS:
 1664  1665  1666 -168 -1667 0
 1664  1665  1666 -168 -1668 0
 1664  1665  1666 -168  1669 0

c  1+1 --> 2
c    (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0 ∧  p_168) -> (-b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0)
c  in CNF:
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_2
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨  b^{1, 169}_1
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ -p_168 ∨ -b^{1, 169}_0
c  in DIMACS:
 1664  1665 -1666 -168 -1667 0
 1664  1665 -1666 -168  1668 0
 1664  1665 -1666 -168 -1669 0

c  2+1 --> break 
c    (-b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧  p_168) -> break
c  in CNF:
c     b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 1664 -1665  1666 -168 1162 0


c  2-1 --> 1
c    (-b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧ -p_168) -> (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0)
c  in CNF:
c     b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_2
c     b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_1
c     b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨  b^{1, 169}_0
c  in DIMACS:
 1664 -1665  1666  168 -1667 0
 1664 -1665  1666  168 -1668 0
 1664 -1665  1666  168  1669 0

c  1-1 --> 0
c    (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0 ∧ -p_168) -> (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧ -b^{1, 169}_0)
c  in CNF:
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_2
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_1
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_0
c  in DIMACS:
 1664  1665 -1666  168 -1667 0
 1664  1665 -1666  168 -1668 0
 1664  1665 -1666  168 -1669 0

c  0-1 --> -1
c    (-b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧ -p_168) -> ( b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0)
c  in CNF:
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨  b^{1, 169}_2
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_1
c     b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨  b^{1, 169}_0
c  in DIMACS:
 1664  1665  1666  168  1667 0
 1664  1665  1666  168 -1668 0
 1664  1665  1666  168  1669 0

c  -1-1 --> -2
c    ( b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧  b^{1, 168}_0 ∧ -p_168) -> ( b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0)
c  in CNF:
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨  b^{1, 169}_2
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨  b^{1, 169}_1
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨  p_168 ∨ -b^{1, 169}_0
c  in DIMACS:
-1664  1665 -1666  168  1667 0
-1664  1665 -1666  168  1668 0
-1664  1665 -1666  168 -1669 0

c  -2-1 --> break 
c    ( b^{1, 168}_2 ∧  b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨  b^{1, 168}_0 ∨  p_168 ∨ break
c  in DIMACS:
-1664 -1665  1666  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 168}_2 ∧ -b^{1, 168}_1 ∧ -b^{1, 168}_0 ∧ true) 
c  in CNF:
c    -b^{1, 168}_2 ∨  b^{1, 168}_1 ∨  b^{1, 168}_0 ∨ false 
c  in DIMACS:
-1664  1665  1666  0

c  3 does not represent an automaton state.
c    -(-b^{1, 168}_2 ∧  b^{1, 168}_1 ∧  b^{1, 168}_0 ∧ true) 
c  in CNF:
c     b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ false 
c  in DIMACS:
 1664 -1665 -1666  0
c  -3 does not represent an automaton state.
c    -( b^{1, 168}_2 ∧  b^{1, 168}_1 ∧  b^{1, 168}_0 ∧ true) 
c  in CNF:
c    -b^{1, 168}_2 ∨ -b^{1, 168}_1 ∨ -b^{1, 168}_0 ∨ false 
c  in DIMACS:
-1664 -1665 -1666  0

c i = 169
c  -2+1 --> -1
c    ( b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧  p_169) -> ( b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0)
c  in CNF:
c    -b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨  b^{1, 170}_2
c    -b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_1
c    -b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨  b^{1, 170}_0
c  in DIMACS:
-1667 -1668  1669 -169  1670 0
-1667 -1668  1669 -169 -1671 0
-1667 -1668  1669 -169  1672 0

c  -1+1 --> 0
c    ( b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0 ∧  p_169) -> (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧ -b^{1, 170}_0)
c  in CNF:
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_2
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_1
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_0
c  in DIMACS:
-1667  1668 -1669 -169 -1670 0
-1667  1668 -1669 -169 -1671 0
-1667  1668 -1669 -169 -1672 0

c  0+1 --> 1
c    (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧  p_169) -> (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0)
c  in CNF:
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_2
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_1
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨  b^{1, 170}_0
c  in DIMACS:
 1667  1668  1669 -169 -1670 0
 1667  1668  1669 -169 -1671 0
 1667  1668  1669 -169  1672 0

c  1+1 --> 2
c    (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0 ∧  p_169) -> (-b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0)
c  in CNF:
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_2
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨  b^{1, 170}_1
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ -p_169 ∨ -b^{1, 170}_0
c  in DIMACS:
 1667  1668 -1669 -169 -1670 0
 1667  1668 -1669 -169  1671 0
 1667  1668 -1669 -169 -1672 0

c  2+1 --> break 
c    (-b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧  p_169) -> break
c  in CNF:
c     b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ -p_169 ∨ break
c  in DIMACS:
 1667 -1668  1669 -169 1162 0


c  2-1 --> 1
c    (-b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧ -p_169) -> (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0)
c  in CNF:
c     b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_2
c     b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_1
c     b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨  b^{1, 170}_0
c  in DIMACS:
 1667 -1668  1669  169 -1670 0
 1667 -1668  1669  169 -1671 0
 1667 -1668  1669  169  1672 0

c  1-1 --> 0
c    (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0 ∧ -p_169) -> (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧ -b^{1, 170}_0)
c  in CNF:
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_2
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_1
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_0
c  in DIMACS:
 1667  1668 -1669  169 -1670 0
 1667  1668 -1669  169 -1671 0
 1667  1668 -1669  169 -1672 0

c  0-1 --> -1
c    (-b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧ -p_169) -> ( b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0)
c  in CNF:
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨  b^{1, 170}_2
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_1
c     b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨  b^{1, 170}_0
c  in DIMACS:
 1667  1668  1669  169  1670 0
 1667  1668  1669  169 -1671 0
 1667  1668  1669  169  1672 0

c  -1-1 --> -2
c    ( b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧  b^{1, 169}_0 ∧ -p_169) -> ( b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0)
c  in CNF:
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨  b^{1, 170}_2
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨  b^{1, 170}_1
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨  p_169 ∨ -b^{1, 170}_0
c  in DIMACS:
-1667  1668 -1669  169  1670 0
-1667  1668 -1669  169  1671 0
-1667  1668 -1669  169 -1672 0

c  -2-1 --> break 
c    ( b^{1, 169}_2 ∧  b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧ -p_169) -> break
c  in CNF:
c    -b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨  b^{1, 169}_0 ∨  p_169 ∨ break
c  in DIMACS:
-1667 -1668  1669  169 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 169}_2 ∧ -b^{1, 169}_1 ∧ -b^{1, 169}_0 ∧ true) 
c  in CNF:
c    -b^{1, 169}_2 ∨  b^{1, 169}_1 ∨  b^{1, 169}_0 ∨ false 
c  in DIMACS:
-1667  1668  1669  0

c  3 does not represent an automaton state.
c    -(-b^{1, 169}_2 ∧  b^{1, 169}_1 ∧  b^{1, 169}_0 ∧ true) 
c  in CNF:
c     b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ false 
c  in DIMACS:
 1667 -1668 -1669  0
c  -3 does not represent an automaton state.
c    -( b^{1, 169}_2 ∧  b^{1, 169}_1 ∧  b^{1, 169}_0 ∧ true) 
c  in CNF:
c    -b^{1, 169}_2 ∨ -b^{1, 169}_1 ∨ -b^{1, 169}_0 ∨ false 
c  in DIMACS:
-1667 -1668 -1669  0

c i = 170
c  -2+1 --> -1
c    ( b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧  p_170) -> ( b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0)
c  in CNF:
c    -b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨  b^{1, 171}_2
c    -b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_1
c    -b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨  b^{1, 171}_0
c  in DIMACS:
-1670 -1671  1672 -170  1673 0
-1670 -1671  1672 -170 -1674 0
-1670 -1671  1672 -170  1675 0

c  -1+1 --> 0
c    ( b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0 ∧  p_170) -> (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧ -b^{1, 171}_0)
c  in CNF:
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_2
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_1
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_0
c  in DIMACS:
-1670  1671 -1672 -170 -1673 0
-1670  1671 -1672 -170 -1674 0
-1670  1671 -1672 -170 -1675 0

c  0+1 --> 1
c    (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧  p_170) -> (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0)
c  in CNF:
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_2
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_1
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨  b^{1, 171}_0
c  in DIMACS:
 1670  1671  1672 -170 -1673 0
 1670  1671  1672 -170 -1674 0
 1670  1671  1672 -170  1675 0

c  1+1 --> 2
c    (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0 ∧  p_170) -> (-b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0)
c  in CNF:
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_2
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨  b^{1, 171}_1
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ -p_170 ∨ -b^{1, 171}_0
c  in DIMACS:
 1670  1671 -1672 -170 -1673 0
 1670  1671 -1672 -170  1674 0
 1670  1671 -1672 -170 -1675 0

c  2+1 --> break 
c    (-b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧  p_170) -> break
c  in CNF:
c     b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 1670 -1671  1672 -170 1162 0


c  2-1 --> 1
c    (-b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧ -p_170) -> (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0)
c  in CNF:
c     b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_2
c     b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_1
c     b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨  b^{1, 171}_0
c  in DIMACS:
 1670 -1671  1672  170 -1673 0
 1670 -1671  1672  170 -1674 0
 1670 -1671  1672  170  1675 0

c  1-1 --> 0
c    (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0 ∧ -p_170) -> (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧ -b^{1, 171}_0)
c  in CNF:
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_2
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_1
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_0
c  in DIMACS:
 1670  1671 -1672  170 -1673 0
 1670  1671 -1672  170 -1674 0
 1670  1671 -1672  170 -1675 0

c  0-1 --> -1
c    (-b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧ -p_170) -> ( b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0)
c  in CNF:
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨  b^{1, 171}_2
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_1
c     b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨  b^{1, 171}_0
c  in DIMACS:
 1670  1671  1672  170  1673 0
 1670  1671  1672  170 -1674 0
 1670  1671  1672  170  1675 0

c  -1-1 --> -2
c    ( b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧  b^{1, 170}_0 ∧ -p_170) -> ( b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0)
c  in CNF:
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨  b^{1, 171}_2
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨  b^{1, 171}_1
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨  p_170 ∨ -b^{1, 171}_0
c  in DIMACS:
-1670  1671 -1672  170  1673 0
-1670  1671 -1672  170  1674 0
-1670  1671 -1672  170 -1675 0

c  -2-1 --> break 
c    ( b^{1, 170}_2 ∧  b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨  b^{1, 170}_0 ∨  p_170 ∨ break
c  in DIMACS:
-1670 -1671  1672  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 170}_2 ∧ -b^{1, 170}_1 ∧ -b^{1, 170}_0 ∧ true) 
c  in CNF:
c    -b^{1, 170}_2 ∨  b^{1, 170}_1 ∨  b^{1, 170}_0 ∨ false 
c  in DIMACS:
-1670  1671  1672  0

c  3 does not represent an automaton state.
c    -(-b^{1, 170}_2 ∧  b^{1, 170}_1 ∧  b^{1, 170}_0 ∧ true) 
c  in CNF:
c     b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ false 
c  in DIMACS:
 1670 -1671 -1672  0
c  -3 does not represent an automaton state.
c    -( b^{1, 170}_2 ∧  b^{1, 170}_1 ∧  b^{1, 170}_0 ∧ true) 
c  in CNF:
c    -b^{1, 170}_2 ∨ -b^{1, 170}_1 ∨ -b^{1, 170}_0 ∨ false 
c  in DIMACS:
-1670 -1671 -1672  0

c i = 171
c  -2+1 --> -1
c    ( b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧  p_171) -> ( b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0)
c  in CNF:
c    -b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨  b^{1, 172}_2
c    -b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_1
c    -b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨  b^{1, 172}_0
c  in DIMACS:
-1673 -1674  1675 -171  1676 0
-1673 -1674  1675 -171 -1677 0
-1673 -1674  1675 -171  1678 0

c  -1+1 --> 0
c    ( b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0 ∧  p_171) -> (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧ -b^{1, 172}_0)
c  in CNF:
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_2
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_1
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_0
c  in DIMACS:
-1673  1674 -1675 -171 -1676 0
-1673  1674 -1675 -171 -1677 0
-1673  1674 -1675 -171 -1678 0

c  0+1 --> 1
c    (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧  p_171) -> (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0)
c  in CNF:
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_2
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_1
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨  b^{1, 172}_0
c  in DIMACS:
 1673  1674  1675 -171 -1676 0
 1673  1674  1675 -171 -1677 0
 1673  1674  1675 -171  1678 0

c  1+1 --> 2
c    (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0 ∧  p_171) -> (-b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0)
c  in CNF:
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_2
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨  b^{1, 172}_1
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ -p_171 ∨ -b^{1, 172}_0
c  in DIMACS:
 1673  1674 -1675 -171 -1676 0
 1673  1674 -1675 -171  1677 0
 1673  1674 -1675 -171 -1678 0

c  2+1 --> break 
c    (-b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧  p_171) -> break
c  in CNF:
c     b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 1673 -1674  1675 -171 1162 0


c  2-1 --> 1
c    (-b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧ -p_171) -> (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0)
c  in CNF:
c     b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_2
c     b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_1
c     b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨  b^{1, 172}_0
c  in DIMACS:
 1673 -1674  1675  171 -1676 0
 1673 -1674  1675  171 -1677 0
 1673 -1674  1675  171  1678 0

c  1-1 --> 0
c    (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0 ∧ -p_171) -> (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧ -b^{1, 172}_0)
c  in CNF:
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_2
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_1
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_0
c  in DIMACS:
 1673  1674 -1675  171 -1676 0
 1673  1674 -1675  171 -1677 0
 1673  1674 -1675  171 -1678 0

c  0-1 --> -1
c    (-b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧ -p_171) -> ( b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0)
c  in CNF:
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨  b^{1, 172}_2
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_1
c     b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨  b^{1, 172}_0
c  in DIMACS:
 1673  1674  1675  171  1676 0
 1673  1674  1675  171 -1677 0
 1673  1674  1675  171  1678 0

c  -1-1 --> -2
c    ( b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧  b^{1, 171}_0 ∧ -p_171) -> ( b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0)
c  in CNF:
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨  b^{1, 172}_2
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨  b^{1, 172}_1
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨  p_171 ∨ -b^{1, 172}_0
c  in DIMACS:
-1673  1674 -1675  171  1676 0
-1673  1674 -1675  171  1677 0
-1673  1674 -1675  171 -1678 0

c  -2-1 --> break 
c    ( b^{1, 171}_2 ∧  b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨  b^{1, 171}_0 ∨  p_171 ∨ break
c  in DIMACS:
-1673 -1674  1675  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 171}_2 ∧ -b^{1, 171}_1 ∧ -b^{1, 171}_0 ∧ true) 
c  in CNF:
c    -b^{1, 171}_2 ∨  b^{1, 171}_1 ∨  b^{1, 171}_0 ∨ false 
c  in DIMACS:
-1673  1674  1675  0

c  3 does not represent an automaton state.
c    -(-b^{1, 171}_2 ∧  b^{1, 171}_1 ∧  b^{1, 171}_0 ∧ true) 
c  in CNF:
c     b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ false 
c  in DIMACS:
 1673 -1674 -1675  0
c  -3 does not represent an automaton state.
c    -( b^{1, 171}_2 ∧  b^{1, 171}_1 ∧  b^{1, 171}_0 ∧ true) 
c  in CNF:
c    -b^{1, 171}_2 ∨ -b^{1, 171}_1 ∨ -b^{1, 171}_0 ∨ false 
c  in DIMACS:
-1673 -1674 -1675  0

c i = 172
c  -2+1 --> -1
c    ( b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧  p_172) -> ( b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0)
c  in CNF:
c    -b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨  b^{1, 173}_2
c    -b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_1
c    -b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨  b^{1, 173}_0
c  in DIMACS:
-1676 -1677  1678 -172  1679 0
-1676 -1677  1678 -172 -1680 0
-1676 -1677  1678 -172  1681 0

c  -1+1 --> 0
c    ( b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0 ∧  p_172) -> (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧ -b^{1, 173}_0)
c  in CNF:
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_2
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_1
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_0
c  in DIMACS:
-1676  1677 -1678 -172 -1679 0
-1676  1677 -1678 -172 -1680 0
-1676  1677 -1678 -172 -1681 0

c  0+1 --> 1
c    (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧  p_172) -> (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0)
c  in CNF:
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_2
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_1
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨  b^{1, 173}_0
c  in DIMACS:
 1676  1677  1678 -172 -1679 0
 1676  1677  1678 -172 -1680 0
 1676  1677  1678 -172  1681 0

c  1+1 --> 2
c    (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0 ∧  p_172) -> (-b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0)
c  in CNF:
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_2
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨  b^{1, 173}_1
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ -p_172 ∨ -b^{1, 173}_0
c  in DIMACS:
 1676  1677 -1678 -172 -1679 0
 1676  1677 -1678 -172  1680 0
 1676  1677 -1678 -172 -1681 0

c  2+1 --> break 
c    (-b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧  p_172) -> break
c  in CNF:
c     b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 1676 -1677  1678 -172 1162 0


c  2-1 --> 1
c    (-b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧ -p_172) -> (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0)
c  in CNF:
c     b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_2
c     b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_1
c     b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨  b^{1, 173}_0
c  in DIMACS:
 1676 -1677  1678  172 -1679 0
 1676 -1677  1678  172 -1680 0
 1676 -1677  1678  172  1681 0

c  1-1 --> 0
c    (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0 ∧ -p_172) -> (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧ -b^{1, 173}_0)
c  in CNF:
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_2
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_1
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_0
c  in DIMACS:
 1676  1677 -1678  172 -1679 0
 1676  1677 -1678  172 -1680 0
 1676  1677 -1678  172 -1681 0

c  0-1 --> -1
c    (-b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧ -p_172) -> ( b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0)
c  in CNF:
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨  b^{1, 173}_2
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_1
c     b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨  b^{1, 173}_0
c  in DIMACS:
 1676  1677  1678  172  1679 0
 1676  1677  1678  172 -1680 0
 1676  1677  1678  172  1681 0

c  -1-1 --> -2
c    ( b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧  b^{1, 172}_0 ∧ -p_172) -> ( b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0)
c  in CNF:
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨  b^{1, 173}_2
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨  b^{1, 173}_1
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨  p_172 ∨ -b^{1, 173}_0
c  in DIMACS:
-1676  1677 -1678  172  1679 0
-1676  1677 -1678  172  1680 0
-1676  1677 -1678  172 -1681 0

c  -2-1 --> break 
c    ( b^{1, 172}_2 ∧  b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨  b^{1, 172}_0 ∨  p_172 ∨ break
c  in DIMACS:
-1676 -1677  1678  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 172}_2 ∧ -b^{1, 172}_1 ∧ -b^{1, 172}_0 ∧ true) 
c  in CNF:
c    -b^{1, 172}_2 ∨  b^{1, 172}_1 ∨  b^{1, 172}_0 ∨ false 
c  in DIMACS:
-1676  1677  1678  0

c  3 does not represent an automaton state.
c    -(-b^{1, 172}_2 ∧  b^{1, 172}_1 ∧  b^{1, 172}_0 ∧ true) 
c  in CNF:
c     b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ false 
c  in DIMACS:
 1676 -1677 -1678  0
c  -3 does not represent an automaton state.
c    -( b^{1, 172}_2 ∧  b^{1, 172}_1 ∧  b^{1, 172}_0 ∧ true) 
c  in CNF:
c    -b^{1, 172}_2 ∨ -b^{1, 172}_1 ∨ -b^{1, 172}_0 ∨ false 
c  in DIMACS:
-1676 -1677 -1678  0

c i = 173
c  -2+1 --> -1
c    ( b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧  p_173) -> ( b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0)
c  in CNF:
c    -b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨  b^{1, 174}_2
c    -b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_1
c    -b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨  b^{1, 174}_0
c  in DIMACS:
-1679 -1680  1681 -173  1682 0
-1679 -1680  1681 -173 -1683 0
-1679 -1680  1681 -173  1684 0

c  -1+1 --> 0
c    ( b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0 ∧  p_173) -> (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧ -b^{1, 174}_0)
c  in CNF:
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_2
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_1
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_0
c  in DIMACS:
-1679  1680 -1681 -173 -1682 0
-1679  1680 -1681 -173 -1683 0
-1679  1680 -1681 -173 -1684 0

c  0+1 --> 1
c    (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧  p_173) -> (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0)
c  in CNF:
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_2
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_1
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨  b^{1, 174}_0
c  in DIMACS:
 1679  1680  1681 -173 -1682 0
 1679  1680  1681 -173 -1683 0
 1679  1680  1681 -173  1684 0

c  1+1 --> 2
c    (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0 ∧  p_173) -> (-b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0)
c  in CNF:
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_2
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨  b^{1, 174}_1
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ -p_173 ∨ -b^{1, 174}_0
c  in DIMACS:
 1679  1680 -1681 -173 -1682 0
 1679  1680 -1681 -173  1683 0
 1679  1680 -1681 -173 -1684 0

c  2+1 --> break 
c    (-b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧  p_173) -> break
c  in CNF:
c     b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ -p_173 ∨ break
c  in DIMACS:
 1679 -1680  1681 -173 1162 0


c  2-1 --> 1
c    (-b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧ -p_173) -> (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0)
c  in CNF:
c     b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_2
c     b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_1
c     b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨  b^{1, 174}_0
c  in DIMACS:
 1679 -1680  1681  173 -1682 0
 1679 -1680  1681  173 -1683 0
 1679 -1680  1681  173  1684 0

c  1-1 --> 0
c    (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0 ∧ -p_173) -> (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧ -b^{1, 174}_0)
c  in CNF:
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_2
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_1
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_0
c  in DIMACS:
 1679  1680 -1681  173 -1682 0
 1679  1680 -1681  173 -1683 0
 1679  1680 -1681  173 -1684 0

c  0-1 --> -1
c    (-b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧ -p_173) -> ( b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0)
c  in CNF:
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨  b^{1, 174}_2
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_1
c     b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨  b^{1, 174}_0
c  in DIMACS:
 1679  1680  1681  173  1682 0
 1679  1680  1681  173 -1683 0
 1679  1680  1681  173  1684 0

c  -1-1 --> -2
c    ( b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧  b^{1, 173}_0 ∧ -p_173) -> ( b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0)
c  in CNF:
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨  b^{1, 174}_2
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨  b^{1, 174}_1
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨  p_173 ∨ -b^{1, 174}_0
c  in DIMACS:
-1679  1680 -1681  173  1682 0
-1679  1680 -1681  173  1683 0
-1679  1680 -1681  173 -1684 0

c  -2-1 --> break 
c    ( b^{1, 173}_2 ∧  b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧ -p_173) -> break
c  in CNF:
c    -b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨  b^{1, 173}_0 ∨  p_173 ∨ break
c  in DIMACS:
-1679 -1680  1681  173 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 173}_2 ∧ -b^{1, 173}_1 ∧ -b^{1, 173}_0 ∧ true) 
c  in CNF:
c    -b^{1, 173}_2 ∨  b^{1, 173}_1 ∨  b^{1, 173}_0 ∨ false 
c  in DIMACS:
-1679  1680  1681  0

c  3 does not represent an automaton state.
c    -(-b^{1, 173}_2 ∧  b^{1, 173}_1 ∧  b^{1, 173}_0 ∧ true) 
c  in CNF:
c     b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ false 
c  in DIMACS:
 1679 -1680 -1681  0
c  -3 does not represent an automaton state.
c    -( b^{1, 173}_2 ∧  b^{1, 173}_1 ∧  b^{1, 173}_0 ∧ true) 
c  in CNF:
c    -b^{1, 173}_2 ∨ -b^{1, 173}_1 ∨ -b^{1, 173}_0 ∨ false 
c  in DIMACS:
-1679 -1680 -1681  0

c i = 174
c  -2+1 --> -1
c    ( b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧  p_174) -> ( b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0)
c  in CNF:
c    -b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨  b^{1, 175}_2
c    -b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_1
c    -b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨  b^{1, 175}_0
c  in DIMACS:
-1682 -1683  1684 -174  1685 0
-1682 -1683  1684 -174 -1686 0
-1682 -1683  1684 -174  1687 0

c  -1+1 --> 0
c    ( b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0 ∧  p_174) -> (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧ -b^{1, 175}_0)
c  in CNF:
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_2
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_1
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_0
c  in DIMACS:
-1682  1683 -1684 -174 -1685 0
-1682  1683 -1684 -174 -1686 0
-1682  1683 -1684 -174 -1687 0

c  0+1 --> 1
c    (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧  p_174) -> (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0)
c  in CNF:
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_2
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_1
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨  b^{1, 175}_0
c  in DIMACS:
 1682  1683  1684 -174 -1685 0
 1682  1683  1684 -174 -1686 0
 1682  1683  1684 -174  1687 0

c  1+1 --> 2
c    (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0 ∧  p_174) -> (-b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0)
c  in CNF:
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_2
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨  b^{1, 175}_1
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ -p_174 ∨ -b^{1, 175}_0
c  in DIMACS:
 1682  1683 -1684 -174 -1685 0
 1682  1683 -1684 -174  1686 0
 1682  1683 -1684 -174 -1687 0

c  2+1 --> break 
c    (-b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧  p_174) -> break
c  in CNF:
c     b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 1682 -1683  1684 -174 1162 0


c  2-1 --> 1
c    (-b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧ -p_174) -> (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0)
c  in CNF:
c     b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_2
c     b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_1
c     b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨  b^{1, 175}_0
c  in DIMACS:
 1682 -1683  1684  174 -1685 0
 1682 -1683  1684  174 -1686 0
 1682 -1683  1684  174  1687 0

c  1-1 --> 0
c    (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0 ∧ -p_174) -> (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧ -b^{1, 175}_0)
c  in CNF:
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_2
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_1
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_0
c  in DIMACS:
 1682  1683 -1684  174 -1685 0
 1682  1683 -1684  174 -1686 0
 1682  1683 -1684  174 -1687 0

c  0-1 --> -1
c    (-b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧ -p_174) -> ( b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0)
c  in CNF:
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨  b^{1, 175}_2
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_1
c     b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨  b^{1, 175}_0
c  in DIMACS:
 1682  1683  1684  174  1685 0
 1682  1683  1684  174 -1686 0
 1682  1683  1684  174  1687 0

c  -1-1 --> -2
c    ( b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧  b^{1, 174}_0 ∧ -p_174) -> ( b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0)
c  in CNF:
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨  b^{1, 175}_2
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨  b^{1, 175}_1
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨  p_174 ∨ -b^{1, 175}_0
c  in DIMACS:
-1682  1683 -1684  174  1685 0
-1682  1683 -1684  174  1686 0
-1682  1683 -1684  174 -1687 0

c  -2-1 --> break 
c    ( b^{1, 174}_2 ∧  b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨  b^{1, 174}_0 ∨  p_174 ∨ break
c  in DIMACS:
-1682 -1683  1684  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 174}_2 ∧ -b^{1, 174}_1 ∧ -b^{1, 174}_0 ∧ true) 
c  in CNF:
c    -b^{1, 174}_2 ∨  b^{1, 174}_1 ∨  b^{1, 174}_0 ∨ false 
c  in DIMACS:
-1682  1683  1684  0

c  3 does not represent an automaton state.
c    -(-b^{1, 174}_2 ∧  b^{1, 174}_1 ∧  b^{1, 174}_0 ∧ true) 
c  in CNF:
c     b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ false 
c  in DIMACS:
 1682 -1683 -1684  0
c  -3 does not represent an automaton state.
c    -( b^{1, 174}_2 ∧  b^{1, 174}_1 ∧  b^{1, 174}_0 ∧ true) 
c  in CNF:
c    -b^{1, 174}_2 ∨ -b^{1, 174}_1 ∨ -b^{1, 174}_0 ∨ false 
c  in DIMACS:
-1682 -1683 -1684  0

c i = 175
c  -2+1 --> -1
c    ( b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧  p_175) -> ( b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0)
c  in CNF:
c    -b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨  b^{1, 176}_2
c    -b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_1
c    -b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨  b^{1, 176}_0
c  in DIMACS:
-1685 -1686  1687 -175  1688 0
-1685 -1686  1687 -175 -1689 0
-1685 -1686  1687 -175  1690 0

c  -1+1 --> 0
c    ( b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0 ∧  p_175) -> (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧ -b^{1, 176}_0)
c  in CNF:
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_2
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_1
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_0
c  in DIMACS:
-1685  1686 -1687 -175 -1688 0
-1685  1686 -1687 -175 -1689 0
-1685  1686 -1687 -175 -1690 0

c  0+1 --> 1
c    (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧  p_175) -> (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0)
c  in CNF:
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_2
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_1
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨  b^{1, 176}_0
c  in DIMACS:
 1685  1686  1687 -175 -1688 0
 1685  1686  1687 -175 -1689 0
 1685  1686  1687 -175  1690 0

c  1+1 --> 2
c    (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0 ∧  p_175) -> (-b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0)
c  in CNF:
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_2
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨  b^{1, 176}_1
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ -p_175 ∨ -b^{1, 176}_0
c  in DIMACS:
 1685  1686 -1687 -175 -1688 0
 1685  1686 -1687 -175  1689 0
 1685  1686 -1687 -175 -1690 0

c  2+1 --> break 
c    (-b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧  p_175) -> break
c  in CNF:
c     b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 1685 -1686  1687 -175 1162 0


c  2-1 --> 1
c    (-b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧ -p_175) -> (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0)
c  in CNF:
c     b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_2
c     b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_1
c     b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨  b^{1, 176}_0
c  in DIMACS:
 1685 -1686  1687  175 -1688 0
 1685 -1686  1687  175 -1689 0
 1685 -1686  1687  175  1690 0

c  1-1 --> 0
c    (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0 ∧ -p_175) -> (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧ -b^{1, 176}_0)
c  in CNF:
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_2
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_1
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_0
c  in DIMACS:
 1685  1686 -1687  175 -1688 0
 1685  1686 -1687  175 -1689 0
 1685  1686 -1687  175 -1690 0

c  0-1 --> -1
c    (-b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧ -p_175) -> ( b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0)
c  in CNF:
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨  b^{1, 176}_2
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_1
c     b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨  b^{1, 176}_0
c  in DIMACS:
 1685  1686  1687  175  1688 0
 1685  1686  1687  175 -1689 0
 1685  1686  1687  175  1690 0

c  -1-1 --> -2
c    ( b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧  b^{1, 175}_0 ∧ -p_175) -> ( b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0)
c  in CNF:
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨  b^{1, 176}_2
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨  b^{1, 176}_1
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨  p_175 ∨ -b^{1, 176}_0
c  in DIMACS:
-1685  1686 -1687  175  1688 0
-1685  1686 -1687  175  1689 0
-1685  1686 -1687  175 -1690 0

c  -2-1 --> break 
c    ( b^{1, 175}_2 ∧  b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨  b^{1, 175}_0 ∨  p_175 ∨ break
c  in DIMACS:
-1685 -1686  1687  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 175}_2 ∧ -b^{1, 175}_1 ∧ -b^{1, 175}_0 ∧ true) 
c  in CNF:
c    -b^{1, 175}_2 ∨  b^{1, 175}_1 ∨  b^{1, 175}_0 ∨ false 
c  in DIMACS:
-1685  1686  1687  0

c  3 does not represent an automaton state.
c    -(-b^{1, 175}_2 ∧  b^{1, 175}_1 ∧  b^{1, 175}_0 ∧ true) 
c  in CNF:
c     b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ false 
c  in DIMACS:
 1685 -1686 -1687  0
c  -3 does not represent an automaton state.
c    -( b^{1, 175}_2 ∧  b^{1, 175}_1 ∧  b^{1, 175}_0 ∧ true) 
c  in CNF:
c    -b^{1, 175}_2 ∨ -b^{1, 175}_1 ∨ -b^{1, 175}_0 ∨ false 
c  in DIMACS:
-1685 -1686 -1687  0

c i = 176
c  -2+1 --> -1
c    ( b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧  p_176) -> ( b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0)
c  in CNF:
c    -b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨  b^{1, 177}_2
c    -b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_1
c    -b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨  b^{1, 177}_0
c  in DIMACS:
-1688 -1689  1690 -176  1691 0
-1688 -1689  1690 -176 -1692 0
-1688 -1689  1690 -176  1693 0

c  -1+1 --> 0
c    ( b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0 ∧  p_176) -> (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧ -b^{1, 177}_0)
c  in CNF:
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_2
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_1
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_0
c  in DIMACS:
-1688  1689 -1690 -176 -1691 0
-1688  1689 -1690 -176 -1692 0
-1688  1689 -1690 -176 -1693 0

c  0+1 --> 1
c    (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧  p_176) -> (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0)
c  in CNF:
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_2
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_1
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨  b^{1, 177}_0
c  in DIMACS:
 1688  1689  1690 -176 -1691 0
 1688  1689  1690 -176 -1692 0
 1688  1689  1690 -176  1693 0

c  1+1 --> 2
c    (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0 ∧  p_176) -> (-b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0)
c  in CNF:
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_2
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨  b^{1, 177}_1
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ -p_176 ∨ -b^{1, 177}_0
c  in DIMACS:
 1688  1689 -1690 -176 -1691 0
 1688  1689 -1690 -176  1692 0
 1688  1689 -1690 -176 -1693 0

c  2+1 --> break 
c    (-b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧  p_176) -> break
c  in CNF:
c     b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 1688 -1689  1690 -176 1162 0


c  2-1 --> 1
c    (-b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧ -p_176) -> (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0)
c  in CNF:
c     b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_2
c     b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_1
c     b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨  b^{1, 177}_0
c  in DIMACS:
 1688 -1689  1690  176 -1691 0
 1688 -1689  1690  176 -1692 0
 1688 -1689  1690  176  1693 0

c  1-1 --> 0
c    (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0 ∧ -p_176) -> (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧ -b^{1, 177}_0)
c  in CNF:
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_2
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_1
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_0
c  in DIMACS:
 1688  1689 -1690  176 -1691 0
 1688  1689 -1690  176 -1692 0
 1688  1689 -1690  176 -1693 0

c  0-1 --> -1
c    (-b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧ -p_176) -> ( b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0)
c  in CNF:
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨  b^{1, 177}_2
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_1
c     b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨  b^{1, 177}_0
c  in DIMACS:
 1688  1689  1690  176  1691 0
 1688  1689  1690  176 -1692 0
 1688  1689  1690  176  1693 0

c  -1-1 --> -2
c    ( b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧  b^{1, 176}_0 ∧ -p_176) -> ( b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0)
c  in CNF:
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨  b^{1, 177}_2
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨  b^{1, 177}_1
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨  p_176 ∨ -b^{1, 177}_0
c  in DIMACS:
-1688  1689 -1690  176  1691 0
-1688  1689 -1690  176  1692 0
-1688  1689 -1690  176 -1693 0

c  -2-1 --> break 
c    ( b^{1, 176}_2 ∧  b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨  b^{1, 176}_0 ∨  p_176 ∨ break
c  in DIMACS:
-1688 -1689  1690  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 176}_2 ∧ -b^{1, 176}_1 ∧ -b^{1, 176}_0 ∧ true) 
c  in CNF:
c    -b^{1, 176}_2 ∨  b^{1, 176}_1 ∨  b^{1, 176}_0 ∨ false 
c  in DIMACS:
-1688  1689  1690  0

c  3 does not represent an automaton state.
c    -(-b^{1, 176}_2 ∧  b^{1, 176}_1 ∧  b^{1, 176}_0 ∧ true) 
c  in CNF:
c     b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ false 
c  in DIMACS:
 1688 -1689 -1690  0
c  -3 does not represent an automaton state.
c    -( b^{1, 176}_2 ∧  b^{1, 176}_1 ∧  b^{1, 176}_0 ∧ true) 
c  in CNF:
c    -b^{1, 176}_2 ∨ -b^{1, 176}_1 ∨ -b^{1, 176}_0 ∨ false 
c  in DIMACS:
-1688 -1689 -1690  0

c i = 177
c  -2+1 --> -1
c    ( b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧  p_177) -> ( b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0)
c  in CNF:
c    -b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨  b^{1, 178}_2
c    -b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_1
c    -b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨  b^{1, 178}_0
c  in DIMACS:
-1691 -1692  1693 -177  1694 0
-1691 -1692  1693 -177 -1695 0
-1691 -1692  1693 -177  1696 0

c  -1+1 --> 0
c    ( b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0 ∧  p_177) -> (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧ -b^{1, 178}_0)
c  in CNF:
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_2
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_1
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_0
c  in DIMACS:
-1691  1692 -1693 -177 -1694 0
-1691  1692 -1693 -177 -1695 0
-1691  1692 -1693 -177 -1696 0

c  0+1 --> 1
c    (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧  p_177) -> (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0)
c  in CNF:
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_2
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_1
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨  b^{1, 178}_0
c  in DIMACS:
 1691  1692  1693 -177 -1694 0
 1691  1692  1693 -177 -1695 0
 1691  1692  1693 -177  1696 0

c  1+1 --> 2
c    (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0 ∧  p_177) -> (-b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0)
c  in CNF:
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_2
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨  b^{1, 178}_1
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ -p_177 ∨ -b^{1, 178}_0
c  in DIMACS:
 1691  1692 -1693 -177 -1694 0
 1691  1692 -1693 -177  1695 0
 1691  1692 -1693 -177 -1696 0

c  2+1 --> break 
c    (-b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧  p_177) -> break
c  in CNF:
c     b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ -p_177 ∨ break
c  in DIMACS:
 1691 -1692  1693 -177 1162 0


c  2-1 --> 1
c    (-b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧ -p_177) -> (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0)
c  in CNF:
c     b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_2
c     b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_1
c     b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨  b^{1, 178}_0
c  in DIMACS:
 1691 -1692  1693  177 -1694 0
 1691 -1692  1693  177 -1695 0
 1691 -1692  1693  177  1696 0

c  1-1 --> 0
c    (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0 ∧ -p_177) -> (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧ -b^{1, 178}_0)
c  in CNF:
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_2
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_1
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_0
c  in DIMACS:
 1691  1692 -1693  177 -1694 0
 1691  1692 -1693  177 -1695 0
 1691  1692 -1693  177 -1696 0

c  0-1 --> -1
c    (-b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧ -p_177) -> ( b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0)
c  in CNF:
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨  b^{1, 178}_2
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_1
c     b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨  b^{1, 178}_0
c  in DIMACS:
 1691  1692  1693  177  1694 0
 1691  1692  1693  177 -1695 0
 1691  1692  1693  177  1696 0

c  -1-1 --> -2
c    ( b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧  b^{1, 177}_0 ∧ -p_177) -> ( b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0)
c  in CNF:
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨  b^{1, 178}_2
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨  b^{1, 178}_1
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨  p_177 ∨ -b^{1, 178}_0
c  in DIMACS:
-1691  1692 -1693  177  1694 0
-1691  1692 -1693  177  1695 0
-1691  1692 -1693  177 -1696 0

c  -2-1 --> break 
c    ( b^{1, 177}_2 ∧  b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧ -p_177) -> break
c  in CNF:
c    -b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨  b^{1, 177}_0 ∨  p_177 ∨ break
c  in DIMACS:
-1691 -1692  1693  177 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 177}_2 ∧ -b^{1, 177}_1 ∧ -b^{1, 177}_0 ∧ true) 
c  in CNF:
c    -b^{1, 177}_2 ∨  b^{1, 177}_1 ∨  b^{1, 177}_0 ∨ false 
c  in DIMACS:
-1691  1692  1693  0

c  3 does not represent an automaton state.
c    -(-b^{1, 177}_2 ∧  b^{1, 177}_1 ∧  b^{1, 177}_0 ∧ true) 
c  in CNF:
c     b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ false 
c  in DIMACS:
 1691 -1692 -1693  0
c  -3 does not represent an automaton state.
c    -( b^{1, 177}_2 ∧  b^{1, 177}_1 ∧  b^{1, 177}_0 ∧ true) 
c  in CNF:
c    -b^{1, 177}_2 ∨ -b^{1, 177}_1 ∨ -b^{1, 177}_0 ∨ false 
c  in DIMACS:
-1691 -1692 -1693  0

c i = 178
c  -2+1 --> -1
c    ( b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧  p_178) -> ( b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0)
c  in CNF:
c    -b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨  b^{1, 179}_2
c    -b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_1
c    -b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨  b^{1, 179}_0
c  in DIMACS:
-1694 -1695  1696 -178  1697 0
-1694 -1695  1696 -178 -1698 0
-1694 -1695  1696 -178  1699 0

c  -1+1 --> 0
c    ( b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0 ∧  p_178) -> (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧ -b^{1, 179}_0)
c  in CNF:
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_2
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_1
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_0
c  in DIMACS:
-1694  1695 -1696 -178 -1697 0
-1694  1695 -1696 -178 -1698 0
-1694  1695 -1696 -178 -1699 0

c  0+1 --> 1
c    (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧  p_178) -> (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0)
c  in CNF:
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_2
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_1
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨  b^{1, 179}_0
c  in DIMACS:
 1694  1695  1696 -178 -1697 0
 1694  1695  1696 -178 -1698 0
 1694  1695  1696 -178  1699 0

c  1+1 --> 2
c    (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0 ∧  p_178) -> (-b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0)
c  in CNF:
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_2
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨  b^{1, 179}_1
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ -p_178 ∨ -b^{1, 179}_0
c  in DIMACS:
 1694  1695 -1696 -178 -1697 0
 1694  1695 -1696 -178  1698 0
 1694  1695 -1696 -178 -1699 0

c  2+1 --> break 
c    (-b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧  p_178) -> break
c  in CNF:
c     b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ -p_178 ∨ break
c  in DIMACS:
 1694 -1695  1696 -178 1162 0


c  2-1 --> 1
c    (-b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧ -p_178) -> (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0)
c  in CNF:
c     b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_2
c     b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_1
c     b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨  b^{1, 179}_0
c  in DIMACS:
 1694 -1695  1696  178 -1697 0
 1694 -1695  1696  178 -1698 0
 1694 -1695  1696  178  1699 0

c  1-1 --> 0
c    (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0 ∧ -p_178) -> (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧ -b^{1, 179}_0)
c  in CNF:
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_2
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_1
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_0
c  in DIMACS:
 1694  1695 -1696  178 -1697 0
 1694  1695 -1696  178 -1698 0
 1694  1695 -1696  178 -1699 0

c  0-1 --> -1
c    (-b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧ -p_178) -> ( b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0)
c  in CNF:
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨  b^{1, 179}_2
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_1
c     b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨  b^{1, 179}_0
c  in DIMACS:
 1694  1695  1696  178  1697 0
 1694  1695  1696  178 -1698 0
 1694  1695  1696  178  1699 0

c  -1-1 --> -2
c    ( b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧  b^{1, 178}_0 ∧ -p_178) -> ( b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0)
c  in CNF:
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨  b^{1, 179}_2
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨  b^{1, 179}_1
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨  p_178 ∨ -b^{1, 179}_0
c  in DIMACS:
-1694  1695 -1696  178  1697 0
-1694  1695 -1696  178  1698 0
-1694  1695 -1696  178 -1699 0

c  -2-1 --> break 
c    ( b^{1, 178}_2 ∧  b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧ -p_178) -> break
c  in CNF:
c    -b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨  b^{1, 178}_0 ∨  p_178 ∨ break
c  in DIMACS:
-1694 -1695  1696  178 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 178}_2 ∧ -b^{1, 178}_1 ∧ -b^{1, 178}_0 ∧ true) 
c  in CNF:
c    -b^{1, 178}_2 ∨  b^{1, 178}_1 ∨  b^{1, 178}_0 ∨ false 
c  in DIMACS:
-1694  1695  1696  0

c  3 does not represent an automaton state.
c    -(-b^{1, 178}_2 ∧  b^{1, 178}_1 ∧  b^{1, 178}_0 ∧ true) 
c  in CNF:
c     b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ false 
c  in DIMACS:
 1694 -1695 -1696  0
c  -3 does not represent an automaton state.
c    -( b^{1, 178}_2 ∧  b^{1, 178}_1 ∧  b^{1, 178}_0 ∧ true) 
c  in CNF:
c    -b^{1, 178}_2 ∨ -b^{1, 178}_1 ∨ -b^{1, 178}_0 ∨ false 
c  in DIMACS:
-1694 -1695 -1696  0

c i = 179
c  -2+1 --> -1
c    ( b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧  p_179) -> ( b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0)
c  in CNF:
c    -b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨  b^{1, 180}_2
c    -b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_1
c    -b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨  b^{1, 180}_0
c  in DIMACS:
-1697 -1698  1699 -179  1700 0
-1697 -1698  1699 -179 -1701 0
-1697 -1698  1699 -179  1702 0

c  -1+1 --> 0
c    ( b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0 ∧  p_179) -> (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧ -b^{1, 180}_0)
c  in CNF:
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_2
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_1
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_0
c  in DIMACS:
-1697  1698 -1699 -179 -1700 0
-1697  1698 -1699 -179 -1701 0
-1697  1698 -1699 -179 -1702 0

c  0+1 --> 1
c    (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧  p_179) -> (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0)
c  in CNF:
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_2
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_1
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨  b^{1, 180}_0
c  in DIMACS:
 1697  1698  1699 -179 -1700 0
 1697  1698  1699 -179 -1701 0
 1697  1698  1699 -179  1702 0

c  1+1 --> 2
c    (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0 ∧  p_179) -> (-b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0)
c  in CNF:
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_2
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨  b^{1, 180}_1
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ -p_179 ∨ -b^{1, 180}_0
c  in DIMACS:
 1697  1698 -1699 -179 -1700 0
 1697  1698 -1699 -179  1701 0
 1697  1698 -1699 -179 -1702 0

c  2+1 --> break 
c    (-b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧  p_179) -> break
c  in CNF:
c     b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ -p_179 ∨ break
c  in DIMACS:
 1697 -1698  1699 -179 1162 0


c  2-1 --> 1
c    (-b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧ -p_179) -> (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0)
c  in CNF:
c     b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_2
c     b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_1
c     b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨  b^{1, 180}_0
c  in DIMACS:
 1697 -1698  1699  179 -1700 0
 1697 -1698  1699  179 -1701 0
 1697 -1698  1699  179  1702 0

c  1-1 --> 0
c    (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0 ∧ -p_179) -> (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧ -b^{1, 180}_0)
c  in CNF:
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_2
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_1
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_0
c  in DIMACS:
 1697  1698 -1699  179 -1700 0
 1697  1698 -1699  179 -1701 0
 1697  1698 -1699  179 -1702 0

c  0-1 --> -1
c    (-b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧ -p_179) -> ( b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0)
c  in CNF:
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨  b^{1, 180}_2
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_1
c     b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨  b^{1, 180}_0
c  in DIMACS:
 1697  1698  1699  179  1700 0
 1697  1698  1699  179 -1701 0
 1697  1698  1699  179  1702 0

c  -1-1 --> -2
c    ( b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧  b^{1, 179}_0 ∧ -p_179) -> ( b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0)
c  in CNF:
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨  b^{1, 180}_2
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨  b^{1, 180}_1
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨  p_179 ∨ -b^{1, 180}_0
c  in DIMACS:
-1697  1698 -1699  179  1700 0
-1697  1698 -1699  179  1701 0
-1697  1698 -1699  179 -1702 0

c  -2-1 --> break 
c    ( b^{1, 179}_2 ∧  b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧ -p_179) -> break
c  in CNF:
c    -b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨  b^{1, 179}_0 ∨  p_179 ∨ break
c  in DIMACS:
-1697 -1698  1699  179 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 179}_2 ∧ -b^{1, 179}_1 ∧ -b^{1, 179}_0 ∧ true) 
c  in CNF:
c    -b^{1, 179}_2 ∨  b^{1, 179}_1 ∨  b^{1, 179}_0 ∨ false 
c  in DIMACS:
-1697  1698  1699  0

c  3 does not represent an automaton state.
c    -(-b^{1, 179}_2 ∧  b^{1, 179}_1 ∧  b^{1, 179}_0 ∧ true) 
c  in CNF:
c     b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ false 
c  in DIMACS:
 1697 -1698 -1699  0
c  -3 does not represent an automaton state.
c    -( b^{1, 179}_2 ∧  b^{1, 179}_1 ∧  b^{1, 179}_0 ∧ true) 
c  in CNF:
c    -b^{1, 179}_2 ∨ -b^{1, 179}_1 ∨ -b^{1, 179}_0 ∨ false 
c  in DIMACS:
-1697 -1698 -1699  0

c i = 180
c  -2+1 --> -1
c    ( b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧  p_180) -> ( b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0)
c  in CNF:
c    -b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨  b^{1, 181}_2
c    -b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_1
c    -b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨  b^{1, 181}_0
c  in DIMACS:
-1700 -1701  1702 -180  1703 0
-1700 -1701  1702 -180 -1704 0
-1700 -1701  1702 -180  1705 0

c  -1+1 --> 0
c    ( b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0 ∧  p_180) -> (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧ -b^{1, 181}_0)
c  in CNF:
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_2
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_1
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_0
c  in DIMACS:
-1700  1701 -1702 -180 -1703 0
-1700  1701 -1702 -180 -1704 0
-1700  1701 -1702 -180 -1705 0

c  0+1 --> 1
c    (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧  p_180) -> (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0)
c  in CNF:
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_2
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_1
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨  b^{1, 181}_0
c  in DIMACS:
 1700  1701  1702 -180 -1703 0
 1700  1701  1702 -180 -1704 0
 1700  1701  1702 -180  1705 0

c  1+1 --> 2
c    (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0 ∧  p_180) -> (-b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0)
c  in CNF:
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_2
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨  b^{1, 181}_1
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ -p_180 ∨ -b^{1, 181}_0
c  in DIMACS:
 1700  1701 -1702 -180 -1703 0
 1700  1701 -1702 -180  1704 0
 1700  1701 -1702 -180 -1705 0

c  2+1 --> break 
c    (-b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧  p_180) -> break
c  in CNF:
c     b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 1700 -1701  1702 -180 1162 0


c  2-1 --> 1
c    (-b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧ -p_180) -> (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0)
c  in CNF:
c     b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_2
c     b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_1
c     b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨  b^{1, 181}_0
c  in DIMACS:
 1700 -1701  1702  180 -1703 0
 1700 -1701  1702  180 -1704 0
 1700 -1701  1702  180  1705 0

c  1-1 --> 0
c    (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0 ∧ -p_180) -> (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧ -b^{1, 181}_0)
c  in CNF:
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_2
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_1
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_0
c  in DIMACS:
 1700  1701 -1702  180 -1703 0
 1700  1701 -1702  180 -1704 0
 1700  1701 -1702  180 -1705 0

c  0-1 --> -1
c    (-b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧ -p_180) -> ( b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0)
c  in CNF:
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨  b^{1, 181}_2
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_1
c     b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨  b^{1, 181}_0
c  in DIMACS:
 1700  1701  1702  180  1703 0
 1700  1701  1702  180 -1704 0
 1700  1701  1702  180  1705 0

c  -1-1 --> -2
c    ( b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧  b^{1, 180}_0 ∧ -p_180) -> ( b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0)
c  in CNF:
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨  b^{1, 181}_2
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨  b^{1, 181}_1
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨  p_180 ∨ -b^{1, 181}_0
c  in DIMACS:
-1700  1701 -1702  180  1703 0
-1700  1701 -1702  180  1704 0
-1700  1701 -1702  180 -1705 0

c  -2-1 --> break 
c    ( b^{1, 180}_2 ∧  b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨  b^{1, 180}_0 ∨  p_180 ∨ break
c  in DIMACS:
-1700 -1701  1702  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 180}_2 ∧ -b^{1, 180}_1 ∧ -b^{1, 180}_0 ∧ true) 
c  in CNF:
c    -b^{1, 180}_2 ∨  b^{1, 180}_1 ∨  b^{1, 180}_0 ∨ false 
c  in DIMACS:
-1700  1701  1702  0

c  3 does not represent an automaton state.
c    -(-b^{1, 180}_2 ∧  b^{1, 180}_1 ∧  b^{1, 180}_0 ∧ true) 
c  in CNF:
c     b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ false 
c  in DIMACS:
 1700 -1701 -1702  0
c  -3 does not represent an automaton state.
c    -( b^{1, 180}_2 ∧  b^{1, 180}_1 ∧  b^{1, 180}_0 ∧ true) 
c  in CNF:
c    -b^{1, 180}_2 ∨ -b^{1, 180}_1 ∨ -b^{1, 180}_0 ∨ false 
c  in DIMACS:
-1700 -1701 -1702  0

c i = 181
c  -2+1 --> -1
c    ( b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧  p_181) -> ( b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0)
c  in CNF:
c    -b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨  b^{1, 182}_2
c    -b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_1
c    -b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨  b^{1, 182}_0
c  in DIMACS:
-1703 -1704  1705 -181  1706 0
-1703 -1704  1705 -181 -1707 0
-1703 -1704  1705 -181  1708 0

c  -1+1 --> 0
c    ( b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0 ∧  p_181) -> (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧ -b^{1, 182}_0)
c  in CNF:
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_2
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_1
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_0
c  in DIMACS:
-1703  1704 -1705 -181 -1706 0
-1703  1704 -1705 -181 -1707 0
-1703  1704 -1705 -181 -1708 0

c  0+1 --> 1
c    (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧  p_181) -> (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0)
c  in CNF:
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_2
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_1
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨  b^{1, 182}_0
c  in DIMACS:
 1703  1704  1705 -181 -1706 0
 1703  1704  1705 -181 -1707 0
 1703  1704  1705 -181  1708 0

c  1+1 --> 2
c    (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0 ∧  p_181) -> (-b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0)
c  in CNF:
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_2
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨  b^{1, 182}_1
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ -p_181 ∨ -b^{1, 182}_0
c  in DIMACS:
 1703  1704 -1705 -181 -1706 0
 1703  1704 -1705 -181  1707 0
 1703  1704 -1705 -181 -1708 0

c  2+1 --> break 
c    (-b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧  p_181) -> break
c  in CNF:
c     b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ -p_181 ∨ break
c  in DIMACS:
 1703 -1704  1705 -181 1162 0


c  2-1 --> 1
c    (-b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧ -p_181) -> (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0)
c  in CNF:
c     b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_2
c     b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_1
c     b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨  b^{1, 182}_0
c  in DIMACS:
 1703 -1704  1705  181 -1706 0
 1703 -1704  1705  181 -1707 0
 1703 -1704  1705  181  1708 0

c  1-1 --> 0
c    (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0 ∧ -p_181) -> (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧ -b^{1, 182}_0)
c  in CNF:
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_2
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_1
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_0
c  in DIMACS:
 1703  1704 -1705  181 -1706 0
 1703  1704 -1705  181 -1707 0
 1703  1704 -1705  181 -1708 0

c  0-1 --> -1
c    (-b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧ -p_181) -> ( b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0)
c  in CNF:
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨  b^{1, 182}_2
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_1
c     b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨  b^{1, 182}_0
c  in DIMACS:
 1703  1704  1705  181  1706 0
 1703  1704  1705  181 -1707 0
 1703  1704  1705  181  1708 0

c  -1-1 --> -2
c    ( b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧  b^{1, 181}_0 ∧ -p_181) -> ( b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0)
c  in CNF:
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨  b^{1, 182}_2
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨  b^{1, 182}_1
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨  p_181 ∨ -b^{1, 182}_0
c  in DIMACS:
-1703  1704 -1705  181  1706 0
-1703  1704 -1705  181  1707 0
-1703  1704 -1705  181 -1708 0

c  -2-1 --> break 
c    ( b^{1, 181}_2 ∧  b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧ -p_181) -> break
c  in CNF:
c    -b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨  b^{1, 181}_0 ∨  p_181 ∨ break
c  in DIMACS:
-1703 -1704  1705  181 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 181}_2 ∧ -b^{1, 181}_1 ∧ -b^{1, 181}_0 ∧ true) 
c  in CNF:
c    -b^{1, 181}_2 ∨  b^{1, 181}_1 ∨  b^{1, 181}_0 ∨ false 
c  in DIMACS:
-1703  1704  1705  0

c  3 does not represent an automaton state.
c    -(-b^{1, 181}_2 ∧  b^{1, 181}_1 ∧  b^{1, 181}_0 ∧ true) 
c  in CNF:
c     b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ false 
c  in DIMACS:
 1703 -1704 -1705  0
c  -3 does not represent an automaton state.
c    -( b^{1, 181}_2 ∧  b^{1, 181}_1 ∧  b^{1, 181}_0 ∧ true) 
c  in CNF:
c    -b^{1, 181}_2 ∨ -b^{1, 181}_1 ∨ -b^{1, 181}_0 ∨ false 
c  in DIMACS:
-1703 -1704 -1705  0

c i = 182
c  -2+1 --> -1
c    ( b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧  p_182) -> ( b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0)
c  in CNF:
c    -b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨  b^{1, 183}_2
c    -b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_1
c    -b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨  b^{1, 183}_0
c  in DIMACS:
-1706 -1707  1708 -182  1709 0
-1706 -1707  1708 -182 -1710 0
-1706 -1707  1708 -182  1711 0

c  -1+1 --> 0
c    ( b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0 ∧  p_182) -> (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧ -b^{1, 183}_0)
c  in CNF:
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_2
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_1
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_0
c  in DIMACS:
-1706  1707 -1708 -182 -1709 0
-1706  1707 -1708 -182 -1710 0
-1706  1707 -1708 -182 -1711 0

c  0+1 --> 1
c    (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧  p_182) -> (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0)
c  in CNF:
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_2
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_1
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨  b^{1, 183}_0
c  in DIMACS:
 1706  1707  1708 -182 -1709 0
 1706  1707  1708 -182 -1710 0
 1706  1707  1708 -182  1711 0

c  1+1 --> 2
c    (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0 ∧  p_182) -> (-b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0)
c  in CNF:
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_2
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨  b^{1, 183}_1
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ -p_182 ∨ -b^{1, 183}_0
c  in DIMACS:
 1706  1707 -1708 -182 -1709 0
 1706  1707 -1708 -182  1710 0
 1706  1707 -1708 -182 -1711 0

c  2+1 --> break 
c    (-b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧  p_182) -> break
c  in CNF:
c     b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 1706 -1707  1708 -182 1162 0


c  2-1 --> 1
c    (-b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧ -p_182) -> (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0)
c  in CNF:
c     b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_2
c     b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_1
c     b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨  b^{1, 183}_0
c  in DIMACS:
 1706 -1707  1708  182 -1709 0
 1706 -1707  1708  182 -1710 0
 1706 -1707  1708  182  1711 0

c  1-1 --> 0
c    (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0 ∧ -p_182) -> (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧ -b^{1, 183}_0)
c  in CNF:
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_2
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_1
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_0
c  in DIMACS:
 1706  1707 -1708  182 -1709 0
 1706  1707 -1708  182 -1710 0
 1706  1707 -1708  182 -1711 0

c  0-1 --> -1
c    (-b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧ -p_182) -> ( b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0)
c  in CNF:
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨  b^{1, 183}_2
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_1
c     b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨  b^{1, 183}_0
c  in DIMACS:
 1706  1707  1708  182  1709 0
 1706  1707  1708  182 -1710 0
 1706  1707  1708  182  1711 0

c  -1-1 --> -2
c    ( b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧  b^{1, 182}_0 ∧ -p_182) -> ( b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0)
c  in CNF:
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨  b^{1, 183}_2
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨  b^{1, 183}_1
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨  p_182 ∨ -b^{1, 183}_0
c  in DIMACS:
-1706  1707 -1708  182  1709 0
-1706  1707 -1708  182  1710 0
-1706  1707 -1708  182 -1711 0

c  -2-1 --> break 
c    ( b^{1, 182}_2 ∧  b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨  b^{1, 182}_0 ∨  p_182 ∨ break
c  in DIMACS:
-1706 -1707  1708  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 182}_2 ∧ -b^{1, 182}_1 ∧ -b^{1, 182}_0 ∧ true) 
c  in CNF:
c    -b^{1, 182}_2 ∨  b^{1, 182}_1 ∨  b^{1, 182}_0 ∨ false 
c  in DIMACS:
-1706  1707  1708  0

c  3 does not represent an automaton state.
c    -(-b^{1, 182}_2 ∧  b^{1, 182}_1 ∧  b^{1, 182}_0 ∧ true) 
c  in CNF:
c     b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ false 
c  in DIMACS:
 1706 -1707 -1708  0
c  -3 does not represent an automaton state.
c    -( b^{1, 182}_2 ∧  b^{1, 182}_1 ∧  b^{1, 182}_0 ∧ true) 
c  in CNF:
c    -b^{1, 182}_2 ∨ -b^{1, 182}_1 ∨ -b^{1, 182}_0 ∨ false 
c  in DIMACS:
-1706 -1707 -1708  0

c i = 183
c  -2+1 --> -1
c    ( b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧  p_183) -> ( b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0)
c  in CNF:
c    -b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨  b^{1, 184}_2
c    -b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_1
c    -b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨  b^{1, 184}_0
c  in DIMACS:
-1709 -1710  1711 -183  1712 0
-1709 -1710  1711 -183 -1713 0
-1709 -1710  1711 -183  1714 0

c  -1+1 --> 0
c    ( b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0 ∧  p_183) -> (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧ -b^{1, 184}_0)
c  in CNF:
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_2
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_1
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_0
c  in DIMACS:
-1709  1710 -1711 -183 -1712 0
-1709  1710 -1711 -183 -1713 0
-1709  1710 -1711 -183 -1714 0

c  0+1 --> 1
c    (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧  p_183) -> (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0)
c  in CNF:
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_2
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_1
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨  b^{1, 184}_0
c  in DIMACS:
 1709  1710  1711 -183 -1712 0
 1709  1710  1711 -183 -1713 0
 1709  1710  1711 -183  1714 0

c  1+1 --> 2
c    (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0 ∧  p_183) -> (-b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0)
c  in CNF:
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_2
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨  b^{1, 184}_1
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ -p_183 ∨ -b^{1, 184}_0
c  in DIMACS:
 1709  1710 -1711 -183 -1712 0
 1709  1710 -1711 -183  1713 0
 1709  1710 -1711 -183 -1714 0

c  2+1 --> break 
c    (-b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧  p_183) -> break
c  in CNF:
c     b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ -p_183 ∨ break
c  in DIMACS:
 1709 -1710  1711 -183 1162 0


c  2-1 --> 1
c    (-b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧ -p_183) -> (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0)
c  in CNF:
c     b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_2
c     b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_1
c     b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨  b^{1, 184}_0
c  in DIMACS:
 1709 -1710  1711  183 -1712 0
 1709 -1710  1711  183 -1713 0
 1709 -1710  1711  183  1714 0

c  1-1 --> 0
c    (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0 ∧ -p_183) -> (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧ -b^{1, 184}_0)
c  in CNF:
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_2
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_1
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_0
c  in DIMACS:
 1709  1710 -1711  183 -1712 0
 1709  1710 -1711  183 -1713 0
 1709  1710 -1711  183 -1714 0

c  0-1 --> -1
c    (-b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧ -p_183) -> ( b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0)
c  in CNF:
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨  b^{1, 184}_2
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_1
c     b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨  b^{1, 184}_0
c  in DIMACS:
 1709  1710  1711  183  1712 0
 1709  1710  1711  183 -1713 0
 1709  1710  1711  183  1714 0

c  -1-1 --> -2
c    ( b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧  b^{1, 183}_0 ∧ -p_183) -> ( b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0)
c  in CNF:
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨  b^{1, 184}_2
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨  b^{1, 184}_1
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨  p_183 ∨ -b^{1, 184}_0
c  in DIMACS:
-1709  1710 -1711  183  1712 0
-1709  1710 -1711  183  1713 0
-1709  1710 -1711  183 -1714 0

c  -2-1 --> break 
c    ( b^{1, 183}_2 ∧  b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧ -p_183) -> break
c  in CNF:
c    -b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨  b^{1, 183}_0 ∨  p_183 ∨ break
c  in DIMACS:
-1709 -1710  1711  183 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 183}_2 ∧ -b^{1, 183}_1 ∧ -b^{1, 183}_0 ∧ true) 
c  in CNF:
c    -b^{1, 183}_2 ∨  b^{1, 183}_1 ∨  b^{1, 183}_0 ∨ false 
c  in DIMACS:
-1709  1710  1711  0

c  3 does not represent an automaton state.
c    -(-b^{1, 183}_2 ∧  b^{1, 183}_1 ∧  b^{1, 183}_0 ∧ true) 
c  in CNF:
c     b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ false 
c  in DIMACS:
 1709 -1710 -1711  0
c  -3 does not represent an automaton state.
c    -( b^{1, 183}_2 ∧  b^{1, 183}_1 ∧  b^{1, 183}_0 ∧ true) 
c  in CNF:
c    -b^{1, 183}_2 ∨ -b^{1, 183}_1 ∨ -b^{1, 183}_0 ∨ false 
c  in DIMACS:
-1709 -1710 -1711  0

c i = 184
c  -2+1 --> -1
c    ( b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧  p_184) -> ( b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0)
c  in CNF:
c    -b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨  b^{1, 185}_2
c    -b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_1
c    -b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨  b^{1, 185}_0
c  in DIMACS:
-1712 -1713  1714 -184  1715 0
-1712 -1713  1714 -184 -1716 0
-1712 -1713  1714 -184  1717 0

c  -1+1 --> 0
c    ( b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0 ∧  p_184) -> (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧ -b^{1, 185}_0)
c  in CNF:
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_2
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_1
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_0
c  in DIMACS:
-1712  1713 -1714 -184 -1715 0
-1712  1713 -1714 -184 -1716 0
-1712  1713 -1714 -184 -1717 0

c  0+1 --> 1
c    (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧  p_184) -> (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0)
c  in CNF:
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_2
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_1
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨  b^{1, 185}_0
c  in DIMACS:
 1712  1713  1714 -184 -1715 0
 1712  1713  1714 -184 -1716 0
 1712  1713  1714 -184  1717 0

c  1+1 --> 2
c    (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0 ∧  p_184) -> (-b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0)
c  in CNF:
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_2
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨  b^{1, 185}_1
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ -p_184 ∨ -b^{1, 185}_0
c  in DIMACS:
 1712  1713 -1714 -184 -1715 0
 1712  1713 -1714 -184  1716 0
 1712  1713 -1714 -184 -1717 0

c  2+1 --> break 
c    (-b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧  p_184) -> break
c  in CNF:
c     b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 1712 -1713  1714 -184 1162 0


c  2-1 --> 1
c    (-b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧ -p_184) -> (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0)
c  in CNF:
c     b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_2
c     b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_1
c     b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨  b^{1, 185}_0
c  in DIMACS:
 1712 -1713  1714  184 -1715 0
 1712 -1713  1714  184 -1716 0
 1712 -1713  1714  184  1717 0

c  1-1 --> 0
c    (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0 ∧ -p_184) -> (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧ -b^{1, 185}_0)
c  in CNF:
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_2
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_1
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_0
c  in DIMACS:
 1712  1713 -1714  184 -1715 0
 1712  1713 -1714  184 -1716 0
 1712  1713 -1714  184 -1717 0

c  0-1 --> -1
c    (-b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧ -p_184) -> ( b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0)
c  in CNF:
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨  b^{1, 185}_2
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_1
c     b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨  b^{1, 185}_0
c  in DIMACS:
 1712  1713  1714  184  1715 0
 1712  1713  1714  184 -1716 0
 1712  1713  1714  184  1717 0

c  -1-1 --> -2
c    ( b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧  b^{1, 184}_0 ∧ -p_184) -> ( b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0)
c  in CNF:
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨  b^{1, 185}_2
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨  b^{1, 185}_1
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨  p_184 ∨ -b^{1, 185}_0
c  in DIMACS:
-1712  1713 -1714  184  1715 0
-1712  1713 -1714  184  1716 0
-1712  1713 -1714  184 -1717 0

c  -2-1 --> break 
c    ( b^{1, 184}_2 ∧  b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨  b^{1, 184}_0 ∨  p_184 ∨ break
c  in DIMACS:
-1712 -1713  1714  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 184}_2 ∧ -b^{1, 184}_1 ∧ -b^{1, 184}_0 ∧ true) 
c  in CNF:
c    -b^{1, 184}_2 ∨  b^{1, 184}_1 ∨  b^{1, 184}_0 ∨ false 
c  in DIMACS:
-1712  1713  1714  0

c  3 does not represent an automaton state.
c    -(-b^{1, 184}_2 ∧  b^{1, 184}_1 ∧  b^{1, 184}_0 ∧ true) 
c  in CNF:
c     b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ false 
c  in DIMACS:
 1712 -1713 -1714  0
c  -3 does not represent an automaton state.
c    -( b^{1, 184}_2 ∧  b^{1, 184}_1 ∧  b^{1, 184}_0 ∧ true) 
c  in CNF:
c    -b^{1, 184}_2 ∨ -b^{1, 184}_1 ∨ -b^{1, 184}_0 ∨ false 
c  in DIMACS:
-1712 -1713 -1714  0

c i = 185
c  -2+1 --> -1
c    ( b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧  p_185) -> ( b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0)
c  in CNF:
c    -b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨  b^{1, 186}_2
c    -b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_1
c    -b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨  b^{1, 186}_0
c  in DIMACS:
-1715 -1716  1717 -185  1718 0
-1715 -1716  1717 -185 -1719 0
-1715 -1716  1717 -185  1720 0

c  -1+1 --> 0
c    ( b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0 ∧  p_185) -> (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧ -b^{1, 186}_0)
c  in CNF:
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_2
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_1
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_0
c  in DIMACS:
-1715  1716 -1717 -185 -1718 0
-1715  1716 -1717 -185 -1719 0
-1715  1716 -1717 -185 -1720 0

c  0+1 --> 1
c    (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧  p_185) -> (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0)
c  in CNF:
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_2
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_1
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨  b^{1, 186}_0
c  in DIMACS:
 1715  1716  1717 -185 -1718 0
 1715  1716  1717 -185 -1719 0
 1715  1716  1717 -185  1720 0

c  1+1 --> 2
c    (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0 ∧  p_185) -> (-b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0)
c  in CNF:
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_2
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨  b^{1, 186}_1
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ -p_185 ∨ -b^{1, 186}_0
c  in DIMACS:
 1715  1716 -1717 -185 -1718 0
 1715  1716 -1717 -185  1719 0
 1715  1716 -1717 -185 -1720 0

c  2+1 --> break 
c    (-b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧  p_185) -> break
c  in CNF:
c     b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ -p_185 ∨ break
c  in DIMACS:
 1715 -1716  1717 -185 1162 0


c  2-1 --> 1
c    (-b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧ -p_185) -> (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0)
c  in CNF:
c     b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_2
c     b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_1
c     b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨  b^{1, 186}_0
c  in DIMACS:
 1715 -1716  1717  185 -1718 0
 1715 -1716  1717  185 -1719 0
 1715 -1716  1717  185  1720 0

c  1-1 --> 0
c    (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0 ∧ -p_185) -> (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧ -b^{1, 186}_0)
c  in CNF:
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_2
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_1
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_0
c  in DIMACS:
 1715  1716 -1717  185 -1718 0
 1715  1716 -1717  185 -1719 0
 1715  1716 -1717  185 -1720 0

c  0-1 --> -1
c    (-b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧ -p_185) -> ( b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0)
c  in CNF:
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨  b^{1, 186}_2
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_1
c     b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨  b^{1, 186}_0
c  in DIMACS:
 1715  1716  1717  185  1718 0
 1715  1716  1717  185 -1719 0
 1715  1716  1717  185  1720 0

c  -1-1 --> -2
c    ( b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧  b^{1, 185}_0 ∧ -p_185) -> ( b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0)
c  in CNF:
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨  b^{1, 186}_2
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨  b^{1, 186}_1
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨  p_185 ∨ -b^{1, 186}_0
c  in DIMACS:
-1715  1716 -1717  185  1718 0
-1715  1716 -1717  185  1719 0
-1715  1716 -1717  185 -1720 0

c  -2-1 --> break 
c    ( b^{1, 185}_2 ∧  b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧ -p_185) -> break
c  in CNF:
c    -b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨  b^{1, 185}_0 ∨  p_185 ∨ break
c  in DIMACS:
-1715 -1716  1717  185 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 185}_2 ∧ -b^{1, 185}_1 ∧ -b^{1, 185}_0 ∧ true) 
c  in CNF:
c    -b^{1, 185}_2 ∨  b^{1, 185}_1 ∨  b^{1, 185}_0 ∨ false 
c  in DIMACS:
-1715  1716  1717  0

c  3 does not represent an automaton state.
c    -(-b^{1, 185}_2 ∧  b^{1, 185}_1 ∧  b^{1, 185}_0 ∧ true) 
c  in CNF:
c     b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ false 
c  in DIMACS:
 1715 -1716 -1717  0
c  -3 does not represent an automaton state.
c    -( b^{1, 185}_2 ∧  b^{1, 185}_1 ∧  b^{1, 185}_0 ∧ true) 
c  in CNF:
c    -b^{1, 185}_2 ∨ -b^{1, 185}_1 ∨ -b^{1, 185}_0 ∨ false 
c  in DIMACS:
-1715 -1716 -1717  0

c i = 186
c  -2+1 --> -1
c    ( b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧  p_186) -> ( b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0)
c  in CNF:
c    -b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨  b^{1, 187}_2
c    -b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_1
c    -b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨  b^{1, 187}_0
c  in DIMACS:
-1718 -1719  1720 -186  1721 0
-1718 -1719  1720 -186 -1722 0
-1718 -1719  1720 -186  1723 0

c  -1+1 --> 0
c    ( b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0 ∧  p_186) -> (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧ -b^{1, 187}_0)
c  in CNF:
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_2
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_1
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_0
c  in DIMACS:
-1718  1719 -1720 -186 -1721 0
-1718  1719 -1720 -186 -1722 0
-1718  1719 -1720 -186 -1723 0

c  0+1 --> 1
c    (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧  p_186) -> (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0)
c  in CNF:
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_2
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_1
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨  b^{1, 187}_0
c  in DIMACS:
 1718  1719  1720 -186 -1721 0
 1718  1719  1720 -186 -1722 0
 1718  1719  1720 -186  1723 0

c  1+1 --> 2
c    (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0 ∧  p_186) -> (-b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0)
c  in CNF:
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_2
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨  b^{1, 187}_1
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ -p_186 ∨ -b^{1, 187}_0
c  in DIMACS:
 1718  1719 -1720 -186 -1721 0
 1718  1719 -1720 -186  1722 0
 1718  1719 -1720 -186 -1723 0

c  2+1 --> break 
c    (-b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧  p_186) -> break
c  in CNF:
c     b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 1718 -1719  1720 -186 1162 0


c  2-1 --> 1
c    (-b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧ -p_186) -> (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0)
c  in CNF:
c     b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_2
c     b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_1
c     b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨  b^{1, 187}_0
c  in DIMACS:
 1718 -1719  1720  186 -1721 0
 1718 -1719  1720  186 -1722 0
 1718 -1719  1720  186  1723 0

c  1-1 --> 0
c    (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0 ∧ -p_186) -> (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧ -b^{1, 187}_0)
c  in CNF:
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_2
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_1
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_0
c  in DIMACS:
 1718  1719 -1720  186 -1721 0
 1718  1719 -1720  186 -1722 0
 1718  1719 -1720  186 -1723 0

c  0-1 --> -1
c    (-b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧ -p_186) -> ( b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0)
c  in CNF:
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨  b^{1, 187}_2
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_1
c     b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨  b^{1, 187}_0
c  in DIMACS:
 1718  1719  1720  186  1721 0
 1718  1719  1720  186 -1722 0
 1718  1719  1720  186  1723 0

c  -1-1 --> -2
c    ( b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧  b^{1, 186}_0 ∧ -p_186) -> ( b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0)
c  in CNF:
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨  b^{1, 187}_2
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨  b^{1, 187}_1
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨  p_186 ∨ -b^{1, 187}_0
c  in DIMACS:
-1718  1719 -1720  186  1721 0
-1718  1719 -1720  186  1722 0
-1718  1719 -1720  186 -1723 0

c  -2-1 --> break 
c    ( b^{1, 186}_2 ∧  b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨  b^{1, 186}_0 ∨  p_186 ∨ break
c  in DIMACS:
-1718 -1719  1720  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 186}_2 ∧ -b^{1, 186}_1 ∧ -b^{1, 186}_0 ∧ true) 
c  in CNF:
c    -b^{1, 186}_2 ∨  b^{1, 186}_1 ∨  b^{1, 186}_0 ∨ false 
c  in DIMACS:
-1718  1719  1720  0

c  3 does not represent an automaton state.
c    -(-b^{1, 186}_2 ∧  b^{1, 186}_1 ∧  b^{1, 186}_0 ∧ true) 
c  in CNF:
c     b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ false 
c  in DIMACS:
 1718 -1719 -1720  0
c  -3 does not represent an automaton state.
c    -( b^{1, 186}_2 ∧  b^{1, 186}_1 ∧  b^{1, 186}_0 ∧ true) 
c  in CNF:
c    -b^{1, 186}_2 ∨ -b^{1, 186}_1 ∨ -b^{1, 186}_0 ∨ false 
c  in DIMACS:
-1718 -1719 -1720  0

c i = 187
c  -2+1 --> -1
c    ( b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧  p_187) -> ( b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0)
c  in CNF:
c    -b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨  b^{1, 188}_2
c    -b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_1
c    -b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨  b^{1, 188}_0
c  in DIMACS:
-1721 -1722  1723 -187  1724 0
-1721 -1722  1723 -187 -1725 0
-1721 -1722  1723 -187  1726 0

c  -1+1 --> 0
c    ( b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0 ∧  p_187) -> (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧ -b^{1, 188}_0)
c  in CNF:
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_2
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_1
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_0
c  in DIMACS:
-1721  1722 -1723 -187 -1724 0
-1721  1722 -1723 -187 -1725 0
-1721  1722 -1723 -187 -1726 0

c  0+1 --> 1
c    (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧  p_187) -> (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0)
c  in CNF:
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_2
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_1
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨  b^{1, 188}_0
c  in DIMACS:
 1721  1722  1723 -187 -1724 0
 1721  1722  1723 -187 -1725 0
 1721  1722  1723 -187  1726 0

c  1+1 --> 2
c    (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0 ∧  p_187) -> (-b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0)
c  in CNF:
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_2
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨  b^{1, 188}_1
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ -p_187 ∨ -b^{1, 188}_0
c  in DIMACS:
 1721  1722 -1723 -187 -1724 0
 1721  1722 -1723 -187  1725 0
 1721  1722 -1723 -187 -1726 0

c  2+1 --> break 
c    (-b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧  p_187) -> break
c  in CNF:
c     b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ -p_187 ∨ break
c  in DIMACS:
 1721 -1722  1723 -187 1162 0


c  2-1 --> 1
c    (-b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧ -p_187) -> (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0)
c  in CNF:
c     b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_2
c     b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_1
c     b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨  b^{1, 188}_0
c  in DIMACS:
 1721 -1722  1723  187 -1724 0
 1721 -1722  1723  187 -1725 0
 1721 -1722  1723  187  1726 0

c  1-1 --> 0
c    (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0 ∧ -p_187) -> (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧ -b^{1, 188}_0)
c  in CNF:
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_2
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_1
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_0
c  in DIMACS:
 1721  1722 -1723  187 -1724 0
 1721  1722 -1723  187 -1725 0
 1721  1722 -1723  187 -1726 0

c  0-1 --> -1
c    (-b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧ -p_187) -> ( b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0)
c  in CNF:
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨  b^{1, 188}_2
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_1
c     b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨  b^{1, 188}_0
c  in DIMACS:
 1721  1722  1723  187  1724 0
 1721  1722  1723  187 -1725 0
 1721  1722  1723  187  1726 0

c  -1-1 --> -2
c    ( b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧  b^{1, 187}_0 ∧ -p_187) -> ( b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0)
c  in CNF:
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨  b^{1, 188}_2
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨  b^{1, 188}_1
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨  p_187 ∨ -b^{1, 188}_0
c  in DIMACS:
-1721  1722 -1723  187  1724 0
-1721  1722 -1723  187  1725 0
-1721  1722 -1723  187 -1726 0

c  -2-1 --> break 
c    ( b^{1, 187}_2 ∧  b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧ -p_187) -> break
c  in CNF:
c    -b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨  b^{1, 187}_0 ∨  p_187 ∨ break
c  in DIMACS:
-1721 -1722  1723  187 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 187}_2 ∧ -b^{1, 187}_1 ∧ -b^{1, 187}_0 ∧ true) 
c  in CNF:
c    -b^{1, 187}_2 ∨  b^{1, 187}_1 ∨  b^{1, 187}_0 ∨ false 
c  in DIMACS:
-1721  1722  1723  0

c  3 does not represent an automaton state.
c    -(-b^{1, 187}_2 ∧  b^{1, 187}_1 ∧  b^{1, 187}_0 ∧ true) 
c  in CNF:
c     b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ false 
c  in DIMACS:
 1721 -1722 -1723  0
c  -3 does not represent an automaton state.
c    -( b^{1, 187}_2 ∧  b^{1, 187}_1 ∧  b^{1, 187}_0 ∧ true) 
c  in CNF:
c    -b^{1, 187}_2 ∨ -b^{1, 187}_1 ∨ -b^{1, 187}_0 ∨ false 
c  in DIMACS:
-1721 -1722 -1723  0

c i = 188
c  -2+1 --> -1
c    ( b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧  p_188) -> ( b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0)
c  in CNF:
c    -b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨  b^{1, 189}_2
c    -b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_1
c    -b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨  b^{1, 189}_0
c  in DIMACS:
-1724 -1725  1726 -188  1727 0
-1724 -1725  1726 -188 -1728 0
-1724 -1725  1726 -188  1729 0

c  -1+1 --> 0
c    ( b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0 ∧  p_188) -> (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧ -b^{1, 189}_0)
c  in CNF:
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_2
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_1
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_0
c  in DIMACS:
-1724  1725 -1726 -188 -1727 0
-1724  1725 -1726 -188 -1728 0
-1724  1725 -1726 -188 -1729 0

c  0+1 --> 1
c    (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧  p_188) -> (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0)
c  in CNF:
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_2
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_1
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨  b^{1, 189}_0
c  in DIMACS:
 1724  1725  1726 -188 -1727 0
 1724  1725  1726 -188 -1728 0
 1724  1725  1726 -188  1729 0

c  1+1 --> 2
c    (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0 ∧  p_188) -> (-b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0)
c  in CNF:
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_2
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨  b^{1, 189}_1
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ -p_188 ∨ -b^{1, 189}_0
c  in DIMACS:
 1724  1725 -1726 -188 -1727 0
 1724  1725 -1726 -188  1728 0
 1724  1725 -1726 -188 -1729 0

c  2+1 --> break 
c    (-b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧  p_188) -> break
c  in CNF:
c     b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 1724 -1725  1726 -188 1162 0


c  2-1 --> 1
c    (-b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧ -p_188) -> (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0)
c  in CNF:
c     b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_2
c     b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_1
c     b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨  b^{1, 189}_0
c  in DIMACS:
 1724 -1725  1726  188 -1727 0
 1724 -1725  1726  188 -1728 0
 1724 -1725  1726  188  1729 0

c  1-1 --> 0
c    (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0 ∧ -p_188) -> (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧ -b^{1, 189}_0)
c  in CNF:
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_2
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_1
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_0
c  in DIMACS:
 1724  1725 -1726  188 -1727 0
 1724  1725 -1726  188 -1728 0
 1724  1725 -1726  188 -1729 0

c  0-1 --> -1
c    (-b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧ -p_188) -> ( b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0)
c  in CNF:
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨  b^{1, 189}_2
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_1
c     b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨  b^{1, 189}_0
c  in DIMACS:
 1724  1725  1726  188  1727 0
 1724  1725  1726  188 -1728 0
 1724  1725  1726  188  1729 0

c  -1-1 --> -2
c    ( b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧  b^{1, 188}_0 ∧ -p_188) -> ( b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0)
c  in CNF:
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨  b^{1, 189}_2
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨  b^{1, 189}_1
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨  p_188 ∨ -b^{1, 189}_0
c  in DIMACS:
-1724  1725 -1726  188  1727 0
-1724  1725 -1726  188  1728 0
-1724  1725 -1726  188 -1729 0

c  -2-1 --> break 
c    ( b^{1, 188}_2 ∧  b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨  b^{1, 188}_0 ∨  p_188 ∨ break
c  in DIMACS:
-1724 -1725  1726  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 188}_2 ∧ -b^{1, 188}_1 ∧ -b^{1, 188}_0 ∧ true) 
c  in CNF:
c    -b^{1, 188}_2 ∨  b^{1, 188}_1 ∨  b^{1, 188}_0 ∨ false 
c  in DIMACS:
-1724  1725  1726  0

c  3 does not represent an automaton state.
c    -(-b^{1, 188}_2 ∧  b^{1, 188}_1 ∧  b^{1, 188}_0 ∧ true) 
c  in CNF:
c     b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ false 
c  in DIMACS:
 1724 -1725 -1726  0
c  -3 does not represent an automaton state.
c    -( b^{1, 188}_2 ∧  b^{1, 188}_1 ∧  b^{1, 188}_0 ∧ true) 
c  in CNF:
c    -b^{1, 188}_2 ∨ -b^{1, 188}_1 ∨ -b^{1, 188}_0 ∨ false 
c  in DIMACS:
-1724 -1725 -1726  0

c i = 189
c  -2+1 --> -1
c    ( b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧  p_189) -> ( b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0)
c  in CNF:
c    -b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨  b^{1, 190}_2
c    -b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_1
c    -b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨  b^{1, 190}_0
c  in DIMACS:
-1727 -1728  1729 -189  1730 0
-1727 -1728  1729 -189 -1731 0
-1727 -1728  1729 -189  1732 0

c  -1+1 --> 0
c    ( b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0 ∧  p_189) -> (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧ -b^{1, 190}_0)
c  in CNF:
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_2
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_1
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_0
c  in DIMACS:
-1727  1728 -1729 -189 -1730 0
-1727  1728 -1729 -189 -1731 0
-1727  1728 -1729 -189 -1732 0

c  0+1 --> 1
c    (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧  p_189) -> (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0)
c  in CNF:
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_2
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_1
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨  b^{1, 190}_0
c  in DIMACS:
 1727  1728  1729 -189 -1730 0
 1727  1728  1729 -189 -1731 0
 1727  1728  1729 -189  1732 0

c  1+1 --> 2
c    (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0 ∧  p_189) -> (-b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0)
c  in CNF:
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_2
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨  b^{1, 190}_1
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ -p_189 ∨ -b^{1, 190}_0
c  in DIMACS:
 1727  1728 -1729 -189 -1730 0
 1727  1728 -1729 -189  1731 0
 1727  1728 -1729 -189 -1732 0

c  2+1 --> break 
c    (-b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧  p_189) -> break
c  in CNF:
c     b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 1727 -1728  1729 -189 1162 0


c  2-1 --> 1
c    (-b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧ -p_189) -> (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0)
c  in CNF:
c     b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_2
c     b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_1
c     b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨  b^{1, 190}_0
c  in DIMACS:
 1727 -1728  1729  189 -1730 0
 1727 -1728  1729  189 -1731 0
 1727 -1728  1729  189  1732 0

c  1-1 --> 0
c    (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0 ∧ -p_189) -> (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧ -b^{1, 190}_0)
c  in CNF:
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_2
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_1
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_0
c  in DIMACS:
 1727  1728 -1729  189 -1730 0
 1727  1728 -1729  189 -1731 0
 1727  1728 -1729  189 -1732 0

c  0-1 --> -1
c    (-b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧ -p_189) -> ( b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0)
c  in CNF:
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨  b^{1, 190}_2
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_1
c     b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨  b^{1, 190}_0
c  in DIMACS:
 1727  1728  1729  189  1730 0
 1727  1728  1729  189 -1731 0
 1727  1728  1729  189  1732 0

c  -1-1 --> -2
c    ( b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧  b^{1, 189}_0 ∧ -p_189) -> ( b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0)
c  in CNF:
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨  b^{1, 190}_2
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨  b^{1, 190}_1
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨  p_189 ∨ -b^{1, 190}_0
c  in DIMACS:
-1727  1728 -1729  189  1730 0
-1727  1728 -1729  189  1731 0
-1727  1728 -1729  189 -1732 0

c  -2-1 --> break 
c    ( b^{1, 189}_2 ∧  b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨  b^{1, 189}_0 ∨  p_189 ∨ break
c  in DIMACS:
-1727 -1728  1729  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 189}_2 ∧ -b^{1, 189}_1 ∧ -b^{1, 189}_0 ∧ true) 
c  in CNF:
c    -b^{1, 189}_2 ∨  b^{1, 189}_1 ∨  b^{1, 189}_0 ∨ false 
c  in DIMACS:
-1727  1728  1729  0

c  3 does not represent an automaton state.
c    -(-b^{1, 189}_2 ∧  b^{1, 189}_1 ∧  b^{1, 189}_0 ∧ true) 
c  in CNF:
c     b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ false 
c  in DIMACS:
 1727 -1728 -1729  0
c  -3 does not represent an automaton state.
c    -( b^{1, 189}_2 ∧  b^{1, 189}_1 ∧  b^{1, 189}_0 ∧ true) 
c  in CNF:
c    -b^{1, 189}_2 ∨ -b^{1, 189}_1 ∨ -b^{1, 189}_0 ∨ false 
c  in DIMACS:
-1727 -1728 -1729  0

c i = 190
c  -2+1 --> -1
c    ( b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧  p_190) -> ( b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0)
c  in CNF:
c    -b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨  b^{1, 191}_2
c    -b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_1
c    -b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨  b^{1, 191}_0
c  in DIMACS:
-1730 -1731  1732 -190  1733 0
-1730 -1731  1732 -190 -1734 0
-1730 -1731  1732 -190  1735 0

c  -1+1 --> 0
c    ( b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0 ∧  p_190) -> (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧ -b^{1, 191}_0)
c  in CNF:
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_2
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_1
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_0
c  in DIMACS:
-1730  1731 -1732 -190 -1733 0
-1730  1731 -1732 -190 -1734 0
-1730  1731 -1732 -190 -1735 0

c  0+1 --> 1
c    (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧  p_190) -> (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0)
c  in CNF:
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_2
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_1
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨  b^{1, 191}_0
c  in DIMACS:
 1730  1731  1732 -190 -1733 0
 1730  1731  1732 -190 -1734 0
 1730  1731  1732 -190  1735 0

c  1+1 --> 2
c    (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0 ∧  p_190) -> (-b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0)
c  in CNF:
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_2
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨  b^{1, 191}_1
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ -p_190 ∨ -b^{1, 191}_0
c  in DIMACS:
 1730  1731 -1732 -190 -1733 0
 1730  1731 -1732 -190  1734 0
 1730  1731 -1732 -190 -1735 0

c  2+1 --> break 
c    (-b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧  p_190) -> break
c  in CNF:
c     b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 1730 -1731  1732 -190 1162 0


c  2-1 --> 1
c    (-b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧ -p_190) -> (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0)
c  in CNF:
c     b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_2
c     b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_1
c     b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨  b^{1, 191}_0
c  in DIMACS:
 1730 -1731  1732  190 -1733 0
 1730 -1731  1732  190 -1734 0
 1730 -1731  1732  190  1735 0

c  1-1 --> 0
c    (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0 ∧ -p_190) -> (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧ -b^{1, 191}_0)
c  in CNF:
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_2
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_1
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_0
c  in DIMACS:
 1730  1731 -1732  190 -1733 0
 1730  1731 -1732  190 -1734 0
 1730  1731 -1732  190 -1735 0

c  0-1 --> -1
c    (-b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧ -p_190) -> ( b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0)
c  in CNF:
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨  b^{1, 191}_2
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_1
c     b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨  b^{1, 191}_0
c  in DIMACS:
 1730  1731  1732  190  1733 0
 1730  1731  1732  190 -1734 0
 1730  1731  1732  190  1735 0

c  -1-1 --> -2
c    ( b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧  b^{1, 190}_0 ∧ -p_190) -> ( b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0)
c  in CNF:
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨  b^{1, 191}_2
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨  b^{1, 191}_1
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨  p_190 ∨ -b^{1, 191}_0
c  in DIMACS:
-1730  1731 -1732  190  1733 0
-1730  1731 -1732  190  1734 0
-1730  1731 -1732  190 -1735 0

c  -2-1 --> break 
c    ( b^{1, 190}_2 ∧  b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨  b^{1, 190}_0 ∨  p_190 ∨ break
c  in DIMACS:
-1730 -1731  1732  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 190}_2 ∧ -b^{1, 190}_1 ∧ -b^{1, 190}_0 ∧ true) 
c  in CNF:
c    -b^{1, 190}_2 ∨  b^{1, 190}_1 ∨  b^{1, 190}_0 ∨ false 
c  in DIMACS:
-1730  1731  1732  0

c  3 does not represent an automaton state.
c    -(-b^{1, 190}_2 ∧  b^{1, 190}_1 ∧  b^{1, 190}_0 ∧ true) 
c  in CNF:
c     b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ false 
c  in DIMACS:
 1730 -1731 -1732  0
c  -3 does not represent an automaton state.
c    -( b^{1, 190}_2 ∧  b^{1, 190}_1 ∧  b^{1, 190}_0 ∧ true) 
c  in CNF:
c    -b^{1, 190}_2 ∨ -b^{1, 190}_1 ∨ -b^{1, 190}_0 ∨ false 
c  in DIMACS:
-1730 -1731 -1732  0

c i = 191
c  -2+1 --> -1
c    ( b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧  p_191) -> ( b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0)
c  in CNF:
c    -b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨  b^{1, 192}_2
c    -b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_1
c    -b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨  b^{1, 192}_0
c  in DIMACS:
-1733 -1734  1735 -191  1736 0
-1733 -1734  1735 -191 -1737 0
-1733 -1734  1735 -191  1738 0

c  -1+1 --> 0
c    ( b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0 ∧  p_191) -> (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧ -b^{1, 192}_0)
c  in CNF:
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_2
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_1
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_0
c  in DIMACS:
-1733  1734 -1735 -191 -1736 0
-1733  1734 -1735 -191 -1737 0
-1733  1734 -1735 -191 -1738 0

c  0+1 --> 1
c    (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧  p_191) -> (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0)
c  in CNF:
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_2
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_1
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨  b^{1, 192}_0
c  in DIMACS:
 1733  1734  1735 -191 -1736 0
 1733  1734  1735 -191 -1737 0
 1733  1734  1735 -191  1738 0

c  1+1 --> 2
c    (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0 ∧  p_191) -> (-b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0)
c  in CNF:
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_2
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨  b^{1, 192}_1
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ -p_191 ∨ -b^{1, 192}_0
c  in DIMACS:
 1733  1734 -1735 -191 -1736 0
 1733  1734 -1735 -191  1737 0
 1733  1734 -1735 -191 -1738 0

c  2+1 --> break 
c    (-b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧  p_191) -> break
c  in CNF:
c     b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ -p_191 ∨ break
c  in DIMACS:
 1733 -1734  1735 -191 1162 0


c  2-1 --> 1
c    (-b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧ -p_191) -> (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0)
c  in CNF:
c     b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_2
c     b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_1
c     b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨  b^{1, 192}_0
c  in DIMACS:
 1733 -1734  1735  191 -1736 0
 1733 -1734  1735  191 -1737 0
 1733 -1734  1735  191  1738 0

c  1-1 --> 0
c    (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0 ∧ -p_191) -> (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧ -b^{1, 192}_0)
c  in CNF:
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_2
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_1
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_0
c  in DIMACS:
 1733  1734 -1735  191 -1736 0
 1733  1734 -1735  191 -1737 0
 1733  1734 -1735  191 -1738 0

c  0-1 --> -1
c    (-b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧ -p_191) -> ( b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0)
c  in CNF:
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨  b^{1, 192}_2
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_1
c     b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨  b^{1, 192}_0
c  in DIMACS:
 1733  1734  1735  191  1736 0
 1733  1734  1735  191 -1737 0
 1733  1734  1735  191  1738 0

c  -1-1 --> -2
c    ( b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧  b^{1, 191}_0 ∧ -p_191) -> ( b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0)
c  in CNF:
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨  b^{1, 192}_2
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨  b^{1, 192}_1
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨  p_191 ∨ -b^{1, 192}_0
c  in DIMACS:
-1733  1734 -1735  191  1736 0
-1733  1734 -1735  191  1737 0
-1733  1734 -1735  191 -1738 0

c  -2-1 --> break 
c    ( b^{1, 191}_2 ∧  b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧ -p_191) -> break
c  in CNF:
c    -b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨  b^{1, 191}_0 ∨  p_191 ∨ break
c  in DIMACS:
-1733 -1734  1735  191 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 191}_2 ∧ -b^{1, 191}_1 ∧ -b^{1, 191}_0 ∧ true) 
c  in CNF:
c    -b^{1, 191}_2 ∨  b^{1, 191}_1 ∨  b^{1, 191}_0 ∨ false 
c  in DIMACS:
-1733  1734  1735  0

c  3 does not represent an automaton state.
c    -(-b^{1, 191}_2 ∧  b^{1, 191}_1 ∧  b^{1, 191}_0 ∧ true) 
c  in CNF:
c     b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ false 
c  in DIMACS:
 1733 -1734 -1735  0
c  -3 does not represent an automaton state.
c    -( b^{1, 191}_2 ∧  b^{1, 191}_1 ∧  b^{1, 191}_0 ∧ true) 
c  in CNF:
c    -b^{1, 191}_2 ∨ -b^{1, 191}_1 ∨ -b^{1, 191}_0 ∨ false 
c  in DIMACS:
-1733 -1734 -1735  0

c i = 192
c  -2+1 --> -1
c    ( b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧  p_192) -> ( b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0)
c  in CNF:
c    -b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨  b^{1, 193}_2
c    -b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_1
c    -b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨  b^{1, 193}_0
c  in DIMACS:
-1736 -1737  1738 -192  1739 0
-1736 -1737  1738 -192 -1740 0
-1736 -1737  1738 -192  1741 0

c  -1+1 --> 0
c    ( b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0 ∧  p_192) -> (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧ -b^{1, 193}_0)
c  in CNF:
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_2
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_1
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_0
c  in DIMACS:
-1736  1737 -1738 -192 -1739 0
-1736  1737 -1738 -192 -1740 0
-1736  1737 -1738 -192 -1741 0

c  0+1 --> 1
c    (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧  p_192) -> (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0)
c  in CNF:
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_2
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_1
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨  b^{1, 193}_0
c  in DIMACS:
 1736  1737  1738 -192 -1739 0
 1736  1737  1738 -192 -1740 0
 1736  1737  1738 -192  1741 0

c  1+1 --> 2
c    (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0 ∧  p_192) -> (-b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0)
c  in CNF:
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_2
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨  b^{1, 193}_1
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ -p_192 ∨ -b^{1, 193}_0
c  in DIMACS:
 1736  1737 -1738 -192 -1739 0
 1736  1737 -1738 -192  1740 0
 1736  1737 -1738 -192 -1741 0

c  2+1 --> break 
c    (-b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧  p_192) -> break
c  in CNF:
c     b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 1736 -1737  1738 -192 1162 0


c  2-1 --> 1
c    (-b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧ -p_192) -> (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0)
c  in CNF:
c     b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_2
c     b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_1
c     b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨  b^{1, 193}_0
c  in DIMACS:
 1736 -1737  1738  192 -1739 0
 1736 -1737  1738  192 -1740 0
 1736 -1737  1738  192  1741 0

c  1-1 --> 0
c    (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0 ∧ -p_192) -> (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧ -b^{1, 193}_0)
c  in CNF:
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_2
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_1
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_0
c  in DIMACS:
 1736  1737 -1738  192 -1739 0
 1736  1737 -1738  192 -1740 0
 1736  1737 -1738  192 -1741 0

c  0-1 --> -1
c    (-b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧ -p_192) -> ( b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0)
c  in CNF:
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨  b^{1, 193}_2
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_1
c     b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨  b^{1, 193}_0
c  in DIMACS:
 1736  1737  1738  192  1739 0
 1736  1737  1738  192 -1740 0
 1736  1737  1738  192  1741 0

c  -1-1 --> -2
c    ( b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧  b^{1, 192}_0 ∧ -p_192) -> ( b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0)
c  in CNF:
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨  b^{1, 193}_2
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨  b^{1, 193}_1
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨  p_192 ∨ -b^{1, 193}_0
c  in DIMACS:
-1736  1737 -1738  192  1739 0
-1736  1737 -1738  192  1740 0
-1736  1737 -1738  192 -1741 0

c  -2-1 --> break 
c    ( b^{1, 192}_2 ∧  b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨  b^{1, 192}_0 ∨  p_192 ∨ break
c  in DIMACS:
-1736 -1737  1738  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 192}_2 ∧ -b^{1, 192}_1 ∧ -b^{1, 192}_0 ∧ true) 
c  in CNF:
c    -b^{1, 192}_2 ∨  b^{1, 192}_1 ∨  b^{1, 192}_0 ∨ false 
c  in DIMACS:
-1736  1737  1738  0

c  3 does not represent an automaton state.
c    -(-b^{1, 192}_2 ∧  b^{1, 192}_1 ∧  b^{1, 192}_0 ∧ true) 
c  in CNF:
c     b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ false 
c  in DIMACS:
 1736 -1737 -1738  0
c  -3 does not represent an automaton state.
c    -( b^{1, 192}_2 ∧  b^{1, 192}_1 ∧  b^{1, 192}_0 ∧ true) 
c  in CNF:
c    -b^{1, 192}_2 ∨ -b^{1, 192}_1 ∨ -b^{1, 192}_0 ∨ false 
c  in DIMACS:
-1736 -1737 -1738  0

c i = 193
c  -2+1 --> -1
c    ( b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧  p_193) -> ( b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0)
c  in CNF:
c    -b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨  b^{1, 194}_2
c    -b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_1
c    -b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨  b^{1, 194}_0
c  in DIMACS:
-1739 -1740  1741 -193  1742 0
-1739 -1740  1741 -193 -1743 0
-1739 -1740  1741 -193  1744 0

c  -1+1 --> 0
c    ( b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0 ∧  p_193) -> (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧ -b^{1, 194}_0)
c  in CNF:
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_2
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_1
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_0
c  in DIMACS:
-1739  1740 -1741 -193 -1742 0
-1739  1740 -1741 -193 -1743 0
-1739  1740 -1741 -193 -1744 0

c  0+1 --> 1
c    (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧  p_193) -> (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0)
c  in CNF:
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_2
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_1
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨  b^{1, 194}_0
c  in DIMACS:
 1739  1740  1741 -193 -1742 0
 1739  1740  1741 -193 -1743 0
 1739  1740  1741 -193  1744 0

c  1+1 --> 2
c    (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0 ∧  p_193) -> (-b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0)
c  in CNF:
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_2
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨  b^{1, 194}_1
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ -p_193 ∨ -b^{1, 194}_0
c  in DIMACS:
 1739  1740 -1741 -193 -1742 0
 1739  1740 -1741 -193  1743 0
 1739  1740 -1741 -193 -1744 0

c  2+1 --> break 
c    (-b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧  p_193) -> break
c  in CNF:
c     b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ -p_193 ∨ break
c  in DIMACS:
 1739 -1740  1741 -193 1162 0


c  2-1 --> 1
c    (-b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧ -p_193) -> (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0)
c  in CNF:
c     b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_2
c     b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_1
c     b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨  b^{1, 194}_0
c  in DIMACS:
 1739 -1740  1741  193 -1742 0
 1739 -1740  1741  193 -1743 0
 1739 -1740  1741  193  1744 0

c  1-1 --> 0
c    (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0 ∧ -p_193) -> (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧ -b^{1, 194}_0)
c  in CNF:
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_2
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_1
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_0
c  in DIMACS:
 1739  1740 -1741  193 -1742 0
 1739  1740 -1741  193 -1743 0
 1739  1740 -1741  193 -1744 0

c  0-1 --> -1
c    (-b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧ -p_193) -> ( b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0)
c  in CNF:
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨  b^{1, 194}_2
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_1
c     b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨  b^{1, 194}_0
c  in DIMACS:
 1739  1740  1741  193  1742 0
 1739  1740  1741  193 -1743 0
 1739  1740  1741  193  1744 0

c  -1-1 --> -2
c    ( b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧  b^{1, 193}_0 ∧ -p_193) -> ( b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0)
c  in CNF:
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨  b^{1, 194}_2
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨  b^{1, 194}_1
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨  p_193 ∨ -b^{1, 194}_0
c  in DIMACS:
-1739  1740 -1741  193  1742 0
-1739  1740 -1741  193  1743 0
-1739  1740 -1741  193 -1744 0

c  -2-1 --> break 
c    ( b^{1, 193}_2 ∧  b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧ -p_193) -> break
c  in CNF:
c    -b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨  b^{1, 193}_0 ∨  p_193 ∨ break
c  in DIMACS:
-1739 -1740  1741  193 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 193}_2 ∧ -b^{1, 193}_1 ∧ -b^{1, 193}_0 ∧ true) 
c  in CNF:
c    -b^{1, 193}_2 ∨  b^{1, 193}_1 ∨  b^{1, 193}_0 ∨ false 
c  in DIMACS:
-1739  1740  1741  0

c  3 does not represent an automaton state.
c    -(-b^{1, 193}_2 ∧  b^{1, 193}_1 ∧  b^{1, 193}_0 ∧ true) 
c  in CNF:
c     b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ false 
c  in DIMACS:
 1739 -1740 -1741  0
c  -3 does not represent an automaton state.
c    -( b^{1, 193}_2 ∧  b^{1, 193}_1 ∧  b^{1, 193}_0 ∧ true) 
c  in CNF:
c    -b^{1, 193}_2 ∨ -b^{1, 193}_1 ∨ -b^{1, 193}_0 ∨ false 
c  in DIMACS:
-1739 -1740 -1741  0

c i = 194
c  -2+1 --> -1
c    ( b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧  p_194) -> ( b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0)
c  in CNF:
c    -b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨  b^{1, 195}_2
c    -b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_1
c    -b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨  b^{1, 195}_0
c  in DIMACS:
-1742 -1743  1744 -194  1745 0
-1742 -1743  1744 -194 -1746 0
-1742 -1743  1744 -194  1747 0

c  -1+1 --> 0
c    ( b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0 ∧  p_194) -> (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧ -b^{1, 195}_0)
c  in CNF:
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_2
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_1
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_0
c  in DIMACS:
-1742  1743 -1744 -194 -1745 0
-1742  1743 -1744 -194 -1746 0
-1742  1743 -1744 -194 -1747 0

c  0+1 --> 1
c    (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧  p_194) -> (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0)
c  in CNF:
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_2
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_1
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨  b^{1, 195}_0
c  in DIMACS:
 1742  1743  1744 -194 -1745 0
 1742  1743  1744 -194 -1746 0
 1742  1743  1744 -194  1747 0

c  1+1 --> 2
c    (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0 ∧  p_194) -> (-b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0)
c  in CNF:
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_2
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨  b^{1, 195}_1
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ -p_194 ∨ -b^{1, 195}_0
c  in DIMACS:
 1742  1743 -1744 -194 -1745 0
 1742  1743 -1744 -194  1746 0
 1742  1743 -1744 -194 -1747 0

c  2+1 --> break 
c    (-b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧  p_194) -> break
c  in CNF:
c     b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ -p_194 ∨ break
c  in DIMACS:
 1742 -1743  1744 -194 1162 0


c  2-1 --> 1
c    (-b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧ -p_194) -> (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0)
c  in CNF:
c     b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_2
c     b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_1
c     b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨  b^{1, 195}_0
c  in DIMACS:
 1742 -1743  1744  194 -1745 0
 1742 -1743  1744  194 -1746 0
 1742 -1743  1744  194  1747 0

c  1-1 --> 0
c    (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0 ∧ -p_194) -> (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧ -b^{1, 195}_0)
c  in CNF:
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_2
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_1
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_0
c  in DIMACS:
 1742  1743 -1744  194 -1745 0
 1742  1743 -1744  194 -1746 0
 1742  1743 -1744  194 -1747 0

c  0-1 --> -1
c    (-b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧ -p_194) -> ( b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0)
c  in CNF:
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨  b^{1, 195}_2
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_1
c     b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨  b^{1, 195}_0
c  in DIMACS:
 1742  1743  1744  194  1745 0
 1742  1743  1744  194 -1746 0
 1742  1743  1744  194  1747 0

c  -1-1 --> -2
c    ( b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧  b^{1, 194}_0 ∧ -p_194) -> ( b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0)
c  in CNF:
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨  b^{1, 195}_2
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨  b^{1, 195}_1
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨  p_194 ∨ -b^{1, 195}_0
c  in DIMACS:
-1742  1743 -1744  194  1745 0
-1742  1743 -1744  194  1746 0
-1742  1743 -1744  194 -1747 0

c  -2-1 --> break 
c    ( b^{1, 194}_2 ∧  b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧ -p_194) -> break
c  in CNF:
c    -b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨  b^{1, 194}_0 ∨  p_194 ∨ break
c  in DIMACS:
-1742 -1743  1744  194 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 194}_2 ∧ -b^{1, 194}_1 ∧ -b^{1, 194}_0 ∧ true) 
c  in CNF:
c    -b^{1, 194}_2 ∨  b^{1, 194}_1 ∨  b^{1, 194}_0 ∨ false 
c  in DIMACS:
-1742  1743  1744  0

c  3 does not represent an automaton state.
c    -(-b^{1, 194}_2 ∧  b^{1, 194}_1 ∧  b^{1, 194}_0 ∧ true) 
c  in CNF:
c     b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ false 
c  in DIMACS:
 1742 -1743 -1744  0
c  -3 does not represent an automaton state.
c    -( b^{1, 194}_2 ∧  b^{1, 194}_1 ∧  b^{1, 194}_0 ∧ true) 
c  in CNF:
c    -b^{1, 194}_2 ∨ -b^{1, 194}_1 ∨ -b^{1, 194}_0 ∨ false 
c  in DIMACS:
-1742 -1743 -1744  0

c i = 195
c  -2+1 --> -1
c    ( b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧  p_195) -> ( b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0)
c  in CNF:
c    -b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨  b^{1, 196}_2
c    -b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_1
c    -b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨  b^{1, 196}_0
c  in DIMACS:
-1745 -1746  1747 -195  1748 0
-1745 -1746  1747 -195 -1749 0
-1745 -1746  1747 -195  1750 0

c  -1+1 --> 0
c    ( b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0 ∧  p_195) -> (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧ -b^{1, 196}_0)
c  in CNF:
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_2
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_1
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_0
c  in DIMACS:
-1745  1746 -1747 -195 -1748 0
-1745  1746 -1747 -195 -1749 0
-1745  1746 -1747 -195 -1750 0

c  0+1 --> 1
c    (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧  p_195) -> (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0)
c  in CNF:
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_2
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_1
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨  b^{1, 196}_0
c  in DIMACS:
 1745  1746  1747 -195 -1748 0
 1745  1746  1747 -195 -1749 0
 1745  1746  1747 -195  1750 0

c  1+1 --> 2
c    (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0 ∧  p_195) -> (-b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0)
c  in CNF:
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_2
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨  b^{1, 196}_1
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ -p_195 ∨ -b^{1, 196}_0
c  in DIMACS:
 1745  1746 -1747 -195 -1748 0
 1745  1746 -1747 -195  1749 0
 1745  1746 -1747 -195 -1750 0

c  2+1 --> break 
c    (-b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧  p_195) -> break
c  in CNF:
c     b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 1745 -1746  1747 -195 1162 0


c  2-1 --> 1
c    (-b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧ -p_195) -> (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0)
c  in CNF:
c     b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_2
c     b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_1
c     b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨  b^{1, 196}_0
c  in DIMACS:
 1745 -1746  1747  195 -1748 0
 1745 -1746  1747  195 -1749 0
 1745 -1746  1747  195  1750 0

c  1-1 --> 0
c    (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0 ∧ -p_195) -> (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧ -b^{1, 196}_0)
c  in CNF:
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_2
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_1
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_0
c  in DIMACS:
 1745  1746 -1747  195 -1748 0
 1745  1746 -1747  195 -1749 0
 1745  1746 -1747  195 -1750 0

c  0-1 --> -1
c    (-b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧ -p_195) -> ( b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0)
c  in CNF:
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨  b^{1, 196}_2
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_1
c     b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨  b^{1, 196}_0
c  in DIMACS:
 1745  1746  1747  195  1748 0
 1745  1746  1747  195 -1749 0
 1745  1746  1747  195  1750 0

c  -1-1 --> -2
c    ( b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧  b^{1, 195}_0 ∧ -p_195) -> ( b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0)
c  in CNF:
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨  b^{1, 196}_2
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨  b^{1, 196}_1
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨  p_195 ∨ -b^{1, 196}_0
c  in DIMACS:
-1745  1746 -1747  195  1748 0
-1745  1746 -1747  195  1749 0
-1745  1746 -1747  195 -1750 0

c  -2-1 --> break 
c    ( b^{1, 195}_2 ∧  b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨  b^{1, 195}_0 ∨  p_195 ∨ break
c  in DIMACS:
-1745 -1746  1747  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 195}_2 ∧ -b^{1, 195}_1 ∧ -b^{1, 195}_0 ∧ true) 
c  in CNF:
c    -b^{1, 195}_2 ∨  b^{1, 195}_1 ∨  b^{1, 195}_0 ∨ false 
c  in DIMACS:
-1745  1746  1747  0

c  3 does not represent an automaton state.
c    -(-b^{1, 195}_2 ∧  b^{1, 195}_1 ∧  b^{1, 195}_0 ∧ true) 
c  in CNF:
c     b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ false 
c  in DIMACS:
 1745 -1746 -1747  0
c  -3 does not represent an automaton state.
c    -( b^{1, 195}_2 ∧  b^{1, 195}_1 ∧  b^{1, 195}_0 ∧ true) 
c  in CNF:
c    -b^{1, 195}_2 ∨ -b^{1, 195}_1 ∨ -b^{1, 195}_0 ∨ false 
c  in DIMACS:
-1745 -1746 -1747  0

c i = 196
c  -2+1 --> -1
c    ( b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧  p_196) -> ( b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0)
c  in CNF:
c    -b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨  b^{1, 197}_2
c    -b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_1
c    -b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨  b^{1, 197}_0
c  in DIMACS:
-1748 -1749  1750 -196  1751 0
-1748 -1749  1750 -196 -1752 0
-1748 -1749  1750 -196  1753 0

c  -1+1 --> 0
c    ( b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0 ∧  p_196) -> (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧ -b^{1, 197}_0)
c  in CNF:
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_2
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_1
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_0
c  in DIMACS:
-1748  1749 -1750 -196 -1751 0
-1748  1749 -1750 -196 -1752 0
-1748  1749 -1750 -196 -1753 0

c  0+1 --> 1
c    (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧  p_196) -> (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0)
c  in CNF:
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_2
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_1
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨  b^{1, 197}_0
c  in DIMACS:
 1748  1749  1750 -196 -1751 0
 1748  1749  1750 -196 -1752 0
 1748  1749  1750 -196  1753 0

c  1+1 --> 2
c    (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0 ∧  p_196) -> (-b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0)
c  in CNF:
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_2
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨  b^{1, 197}_1
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ -p_196 ∨ -b^{1, 197}_0
c  in DIMACS:
 1748  1749 -1750 -196 -1751 0
 1748  1749 -1750 -196  1752 0
 1748  1749 -1750 -196 -1753 0

c  2+1 --> break 
c    (-b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧  p_196) -> break
c  in CNF:
c     b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 1748 -1749  1750 -196 1162 0


c  2-1 --> 1
c    (-b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧ -p_196) -> (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0)
c  in CNF:
c     b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_2
c     b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_1
c     b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨  b^{1, 197}_0
c  in DIMACS:
 1748 -1749  1750  196 -1751 0
 1748 -1749  1750  196 -1752 0
 1748 -1749  1750  196  1753 0

c  1-1 --> 0
c    (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0 ∧ -p_196) -> (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧ -b^{1, 197}_0)
c  in CNF:
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_2
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_1
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_0
c  in DIMACS:
 1748  1749 -1750  196 -1751 0
 1748  1749 -1750  196 -1752 0
 1748  1749 -1750  196 -1753 0

c  0-1 --> -1
c    (-b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧ -p_196) -> ( b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0)
c  in CNF:
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨  b^{1, 197}_2
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_1
c     b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨  b^{1, 197}_0
c  in DIMACS:
 1748  1749  1750  196  1751 0
 1748  1749  1750  196 -1752 0
 1748  1749  1750  196  1753 0

c  -1-1 --> -2
c    ( b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧  b^{1, 196}_0 ∧ -p_196) -> ( b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0)
c  in CNF:
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨  b^{1, 197}_2
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨  b^{1, 197}_1
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨  p_196 ∨ -b^{1, 197}_0
c  in DIMACS:
-1748  1749 -1750  196  1751 0
-1748  1749 -1750  196  1752 0
-1748  1749 -1750  196 -1753 0

c  -2-1 --> break 
c    ( b^{1, 196}_2 ∧  b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨  b^{1, 196}_0 ∨  p_196 ∨ break
c  in DIMACS:
-1748 -1749  1750  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 196}_2 ∧ -b^{1, 196}_1 ∧ -b^{1, 196}_0 ∧ true) 
c  in CNF:
c    -b^{1, 196}_2 ∨  b^{1, 196}_1 ∨  b^{1, 196}_0 ∨ false 
c  in DIMACS:
-1748  1749  1750  0

c  3 does not represent an automaton state.
c    -(-b^{1, 196}_2 ∧  b^{1, 196}_1 ∧  b^{1, 196}_0 ∧ true) 
c  in CNF:
c     b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ false 
c  in DIMACS:
 1748 -1749 -1750  0
c  -3 does not represent an automaton state.
c    -( b^{1, 196}_2 ∧  b^{1, 196}_1 ∧  b^{1, 196}_0 ∧ true) 
c  in CNF:
c    -b^{1, 196}_2 ∨ -b^{1, 196}_1 ∨ -b^{1, 196}_0 ∨ false 
c  in DIMACS:
-1748 -1749 -1750  0

c i = 197
c  -2+1 --> -1
c    ( b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧  p_197) -> ( b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0)
c  in CNF:
c    -b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨  b^{1, 198}_2
c    -b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_1
c    -b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨  b^{1, 198}_0
c  in DIMACS:
-1751 -1752  1753 -197  1754 0
-1751 -1752  1753 -197 -1755 0
-1751 -1752  1753 -197  1756 0

c  -1+1 --> 0
c    ( b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0 ∧  p_197) -> (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧ -b^{1, 198}_0)
c  in CNF:
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_2
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_1
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_0
c  in DIMACS:
-1751  1752 -1753 -197 -1754 0
-1751  1752 -1753 -197 -1755 0
-1751  1752 -1753 -197 -1756 0

c  0+1 --> 1
c    (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧  p_197) -> (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0)
c  in CNF:
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_2
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_1
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨  b^{1, 198}_0
c  in DIMACS:
 1751  1752  1753 -197 -1754 0
 1751  1752  1753 -197 -1755 0
 1751  1752  1753 -197  1756 0

c  1+1 --> 2
c    (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0 ∧  p_197) -> (-b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0)
c  in CNF:
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_2
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨  b^{1, 198}_1
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ -p_197 ∨ -b^{1, 198}_0
c  in DIMACS:
 1751  1752 -1753 -197 -1754 0
 1751  1752 -1753 -197  1755 0
 1751  1752 -1753 -197 -1756 0

c  2+1 --> break 
c    (-b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧  p_197) -> break
c  in CNF:
c     b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ -p_197 ∨ break
c  in DIMACS:
 1751 -1752  1753 -197 1162 0


c  2-1 --> 1
c    (-b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧ -p_197) -> (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0)
c  in CNF:
c     b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_2
c     b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_1
c     b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨  b^{1, 198}_0
c  in DIMACS:
 1751 -1752  1753  197 -1754 0
 1751 -1752  1753  197 -1755 0
 1751 -1752  1753  197  1756 0

c  1-1 --> 0
c    (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0 ∧ -p_197) -> (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧ -b^{1, 198}_0)
c  in CNF:
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_2
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_1
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_0
c  in DIMACS:
 1751  1752 -1753  197 -1754 0
 1751  1752 -1753  197 -1755 0
 1751  1752 -1753  197 -1756 0

c  0-1 --> -1
c    (-b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧ -p_197) -> ( b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0)
c  in CNF:
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨  b^{1, 198}_2
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_1
c     b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨  b^{1, 198}_0
c  in DIMACS:
 1751  1752  1753  197  1754 0
 1751  1752  1753  197 -1755 0
 1751  1752  1753  197  1756 0

c  -1-1 --> -2
c    ( b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧  b^{1, 197}_0 ∧ -p_197) -> ( b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0)
c  in CNF:
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨  b^{1, 198}_2
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨  b^{1, 198}_1
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨  p_197 ∨ -b^{1, 198}_0
c  in DIMACS:
-1751  1752 -1753  197  1754 0
-1751  1752 -1753  197  1755 0
-1751  1752 -1753  197 -1756 0

c  -2-1 --> break 
c    ( b^{1, 197}_2 ∧  b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧ -p_197) -> break
c  in CNF:
c    -b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨  b^{1, 197}_0 ∨  p_197 ∨ break
c  in DIMACS:
-1751 -1752  1753  197 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 197}_2 ∧ -b^{1, 197}_1 ∧ -b^{1, 197}_0 ∧ true) 
c  in CNF:
c    -b^{1, 197}_2 ∨  b^{1, 197}_1 ∨  b^{1, 197}_0 ∨ false 
c  in DIMACS:
-1751  1752  1753  0

c  3 does not represent an automaton state.
c    -(-b^{1, 197}_2 ∧  b^{1, 197}_1 ∧  b^{1, 197}_0 ∧ true) 
c  in CNF:
c     b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ false 
c  in DIMACS:
 1751 -1752 -1753  0
c  -3 does not represent an automaton state.
c    -( b^{1, 197}_2 ∧  b^{1, 197}_1 ∧  b^{1, 197}_0 ∧ true) 
c  in CNF:
c    -b^{1, 197}_2 ∨ -b^{1, 197}_1 ∨ -b^{1, 197}_0 ∨ false 
c  in DIMACS:
-1751 -1752 -1753  0

c i = 198
c  -2+1 --> -1
c    ( b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧  p_198) -> ( b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0)
c  in CNF:
c    -b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨  b^{1, 199}_2
c    -b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_1
c    -b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨  b^{1, 199}_0
c  in DIMACS:
-1754 -1755  1756 -198  1757 0
-1754 -1755  1756 -198 -1758 0
-1754 -1755  1756 -198  1759 0

c  -1+1 --> 0
c    ( b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0 ∧  p_198) -> (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧ -b^{1, 199}_0)
c  in CNF:
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_2
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_1
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_0
c  in DIMACS:
-1754  1755 -1756 -198 -1757 0
-1754  1755 -1756 -198 -1758 0
-1754  1755 -1756 -198 -1759 0

c  0+1 --> 1
c    (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧  p_198) -> (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0)
c  in CNF:
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_2
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_1
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨  b^{1, 199}_0
c  in DIMACS:
 1754  1755  1756 -198 -1757 0
 1754  1755  1756 -198 -1758 0
 1754  1755  1756 -198  1759 0

c  1+1 --> 2
c    (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0 ∧  p_198) -> (-b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0)
c  in CNF:
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_2
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨  b^{1, 199}_1
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ -p_198 ∨ -b^{1, 199}_0
c  in DIMACS:
 1754  1755 -1756 -198 -1757 0
 1754  1755 -1756 -198  1758 0
 1754  1755 -1756 -198 -1759 0

c  2+1 --> break 
c    (-b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧  p_198) -> break
c  in CNF:
c     b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 1754 -1755  1756 -198 1162 0


c  2-1 --> 1
c    (-b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧ -p_198) -> (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0)
c  in CNF:
c     b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_2
c     b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_1
c     b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨  b^{1, 199}_0
c  in DIMACS:
 1754 -1755  1756  198 -1757 0
 1754 -1755  1756  198 -1758 0
 1754 -1755  1756  198  1759 0

c  1-1 --> 0
c    (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0 ∧ -p_198) -> (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧ -b^{1, 199}_0)
c  in CNF:
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_2
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_1
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_0
c  in DIMACS:
 1754  1755 -1756  198 -1757 0
 1754  1755 -1756  198 -1758 0
 1754  1755 -1756  198 -1759 0

c  0-1 --> -1
c    (-b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧ -p_198) -> ( b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0)
c  in CNF:
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨  b^{1, 199}_2
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_1
c     b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨  b^{1, 199}_0
c  in DIMACS:
 1754  1755  1756  198  1757 0
 1754  1755  1756  198 -1758 0
 1754  1755  1756  198  1759 0

c  -1-1 --> -2
c    ( b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧  b^{1, 198}_0 ∧ -p_198) -> ( b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0)
c  in CNF:
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨  b^{1, 199}_2
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨  b^{1, 199}_1
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨  p_198 ∨ -b^{1, 199}_0
c  in DIMACS:
-1754  1755 -1756  198  1757 0
-1754  1755 -1756  198  1758 0
-1754  1755 -1756  198 -1759 0

c  -2-1 --> break 
c    ( b^{1, 198}_2 ∧  b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨  b^{1, 198}_0 ∨  p_198 ∨ break
c  in DIMACS:
-1754 -1755  1756  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 198}_2 ∧ -b^{1, 198}_1 ∧ -b^{1, 198}_0 ∧ true) 
c  in CNF:
c    -b^{1, 198}_2 ∨  b^{1, 198}_1 ∨  b^{1, 198}_0 ∨ false 
c  in DIMACS:
-1754  1755  1756  0

c  3 does not represent an automaton state.
c    -(-b^{1, 198}_2 ∧  b^{1, 198}_1 ∧  b^{1, 198}_0 ∧ true) 
c  in CNF:
c     b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ false 
c  in DIMACS:
 1754 -1755 -1756  0
c  -3 does not represent an automaton state.
c    -( b^{1, 198}_2 ∧  b^{1, 198}_1 ∧  b^{1, 198}_0 ∧ true) 
c  in CNF:
c    -b^{1, 198}_2 ∨ -b^{1, 198}_1 ∨ -b^{1, 198}_0 ∨ false 
c  in DIMACS:
-1754 -1755 -1756  0

c i = 199
c  -2+1 --> -1
c    ( b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧  p_199) -> ( b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0)
c  in CNF:
c    -b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨  b^{1, 200}_2
c    -b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_1
c    -b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨  b^{1, 200}_0
c  in DIMACS:
-1757 -1758  1759 -199  1760 0
-1757 -1758  1759 -199 -1761 0
-1757 -1758  1759 -199  1762 0

c  -1+1 --> 0
c    ( b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0 ∧  p_199) -> (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧ -b^{1, 200}_0)
c  in CNF:
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_2
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_1
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_0
c  in DIMACS:
-1757  1758 -1759 -199 -1760 0
-1757  1758 -1759 -199 -1761 0
-1757  1758 -1759 -199 -1762 0

c  0+1 --> 1
c    (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧  p_199) -> (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0)
c  in CNF:
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_2
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_1
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨  b^{1, 200}_0
c  in DIMACS:
 1757  1758  1759 -199 -1760 0
 1757  1758  1759 -199 -1761 0
 1757  1758  1759 -199  1762 0

c  1+1 --> 2
c    (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0 ∧  p_199) -> (-b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0)
c  in CNF:
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_2
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨  b^{1, 200}_1
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ -p_199 ∨ -b^{1, 200}_0
c  in DIMACS:
 1757  1758 -1759 -199 -1760 0
 1757  1758 -1759 -199  1761 0
 1757  1758 -1759 -199 -1762 0

c  2+1 --> break 
c    (-b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧  p_199) -> break
c  in CNF:
c     b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ -p_199 ∨ break
c  in DIMACS:
 1757 -1758  1759 -199 1162 0


c  2-1 --> 1
c    (-b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧ -p_199) -> (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0)
c  in CNF:
c     b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_2
c     b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_1
c     b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨  b^{1, 200}_0
c  in DIMACS:
 1757 -1758  1759  199 -1760 0
 1757 -1758  1759  199 -1761 0
 1757 -1758  1759  199  1762 0

c  1-1 --> 0
c    (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0 ∧ -p_199) -> (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧ -b^{1, 200}_0)
c  in CNF:
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_2
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_1
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_0
c  in DIMACS:
 1757  1758 -1759  199 -1760 0
 1757  1758 -1759  199 -1761 0
 1757  1758 -1759  199 -1762 0

c  0-1 --> -1
c    (-b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧ -p_199) -> ( b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0)
c  in CNF:
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨  b^{1, 200}_2
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_1
c     b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨  b^{1, 200}_0
c  in DIMACS:
 1757  1758  1759  199  1760 0
 1757  1758  1759  199 -1761 0
 1757  1758  1759  199  1762 0

c  -1-1 --> -2
c    ( b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧  b^{1, 199}_0 ∧ -p_199) -> ( b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0)
c  in CNF:
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨  b^{1, 200}_2
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨  b^{1, 200}_1
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨  p_199 ∨ -b^{1, 200}_0
c  in DIMACS:
-1757  1758 -1759  199  1760 0
-1757  1758 -1759  199  1761 0
-1757  1758 -1759  199 -1762 0

c  -2-1 --> break 
c    ( b^{1, 199}_2 ∧  b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧ -p_199) -> break
c  in CNF:
c    -b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨  b^{1, 199}_0 ∨  p_199 ∨ break
c  in DIMACS:
-1757 -1758  1759  199 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 199}_2 ∧ -b^{1, 199}_1 ∧ -b^{1, 199}_0 ∧ true) 
c  in CNF:
c    -b^{1, 199}_2 ∨  b^{1, 199}_1 ∨  b^{1, 199}_0 ∨ false 
c  in DIMACS:
-1757  1758  1759  0

c  3 does not represent an automaton state.
c    -(-b^{1, 199}_2 ∧  b^{1, 199}_1 ∧  b^{1, 199}_0 ∧ true) 
c  in CNF:
c     b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ false 
c  in DIMACS:
 1757 -1758 -1759  0
c  -3 does not represent an automaton state.
c    -( b^{1, 199}_2 ∧  b^{1, 199}_1 ∧  b^{1, 199}_0 ∧ true) 
c  in CNF:
c    -b^{1, 199}_2 ∨ -b^{1, 199}_1 ∨ -b^{1, 199}_0 ∨ false 
c  in DIMACS:
-1757 -1758 -1759  0

c i = 200
c  -2+1 --> -1
c    ( b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧  p_200) -> ( b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0)
c  in CNF:
c    -b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨  b^{1, 201}_2
c    -b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_1
c    -b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨  b^{1, 201}_0
c  in DIMACS:
-1760 -1761  1762 -200  1763 0
-1760 -1761  1762 -200 -1764 0
-1760 -1761  1762 -200  1765 0

c  -1+1 --> 0
c    ( b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0 ∧  p_200) -> (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧ -b^{1, 201}_0)
c  in CNF:
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_2
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_1
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_0
c  in DIMACS:
-1760  1761 -1762 -200 -1763 0
-1760  1761 -1762 -200 -1764 0
-1760  1761 -1762 -200 -1765 0

c  0+1 --> 1
c    (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧  p_200) -> (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0)
c  in CNF:
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_2
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_1
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨  b^{1, 201}_0
c  in DIMACS:
 1760  1761  1762 -200 -1763 0
 1760  1761  1762 -200 -1764 0
 1760  1761  1762 -200  1765 0

c  1+1 --> 2
c    (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0 ∧  p_200) -> (-b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0)
c  in CNF:
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_2
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨  b^{1, 201}_1
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ -p_200 ∨ -b^{1, 201}_0
c  in DIMACS:
 1760  1761 -1762 -200 -1763 0
 1760  1761 -1762 -200  1764 0
 1760  1761 -1762 -200 -1765 0

c  2+1 --> break 
c    (-b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧  p_200) -> break
c  in CNF:
c     b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 1760 -1761  1762 -200 1162 0


c  2-1 --> 1
c    (-b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧ -p_200) -> (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0)
c  in CNF:
c     b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_2
c     b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_1
c     b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨  b^{1, 201}_0
c  in DIMACS:
 1760 -1761  1762  200 -1763 0
 1760 -1761  1762  200 -1764 0
 1760 -1761  1762  200  1765 0

c  1-1 --> 0
c    (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0 ∧ -p_200) -> (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧ -b^{1, 201}_0)
c  in CNF:
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_2
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_1
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_0
c  in DIMACS:
 1760  1761 -1762  200 -1763 0
 1760  1761 -1762  200 -1764 0
 1760  1761 -1762  200 -1765 0

c  0-1 --> -1
c    (-b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧ -p_200) -> ( b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0)
c  in CNF:
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨  b^{1, 201}_2
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_1
c     b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨  b^{1, 201}_0
c  in DIMACS:
 1760  1761  1762  200  1763 0
 1760  1761  1762  200 -1764 0
 1760  1761  1762  200  1765 0

c  -1-1 --> -2
c    ( b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧  b^{1, 200}_0 ∧ -p_200) -> ( b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0)
c  in CNF:
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨  b^{1, 201}_2
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨  b^{1, 201}_1
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨  p_200 ∨ -b^{1, 201}_0
c  in DIMACS:
-1760  1761 -1762  200  1763 0
-1760  1761 -1762  200  1764 0
-1760  1761 -1762  200 -1765 0

c  -2-1 --> break 
c    ( b^{1, 200}_2 ∧  b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨  b^{1, 200}_0 ∨  p_200 ∨ break
c  in DIMACS:
-1760 -1761  1762  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 200}_2 ∧ -b^{1, 200}_1 ∧ -b^{1, 200}_0 ∧ true) 
c  in CNF:
c    -b^{1, 200}_2 ∨  b^{1, 200}_1 ∨  b^{1, 200}_0 ∨ false 
c  in DIMACS:
-1760  1761  1762  0

c  3 does not represent an automaton state.
c    -(-b^{1, 200}_2 ∧  b^{1, 200}_1 ∧  b^{1, 200}_0 ∧ true) 
c  in CNF:
c     b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ false 
c  in DIMACS:
 1760 -1761 -1762  0
c  -3 does not represent an automaton state.
c    -( b^{1, 200}_2 ∧  b^{1, 200}_1 ∧  b^{1, 200}_0 ∧ true) 
c  in CNF:
c    -b^{1, 200}_2 ∨ -b^{1, 200}_1 ∨ -b^{1, 200}_0 ∨ false 
c  in DIMACS:
-1760 -1761 -1762  0

c i = 201
c  -2+1 --> -1
c    ( b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧  p_201) -> ( b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0)
c  in CNF:
c    -b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨  b^{1, 202}_2
c    -b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_1
c    -b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨  b^{1, 202}_0
c  in DIMACS:
-1763 -1764  1765 -201  1766 0
-1763 -1764  1765 -201 -1767 0
-1763 -1764  1765 -201  1768 0

c  -1+1 --> 0
c    ( b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0 ∧  p_201) -> (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧ -b^{1, 202}_0)
c  in CNF:
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_2
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_1
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_0
c  in DIMACS:
-1763  1764 -1765 -201 -1766 0
-1763  1764 -1765 -201 -1767 0
-1763  1764 -1765 -201 -1768 0

c  0+1 --> 1
c    (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧  p_201) -> (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0)
c  in CNF:
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_2
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_1
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨  b^{1, 202}_0
c  in DIMACS:
 1763  1764  1765 -201 -1766 0
 1763  1764  1765 -201 -1767 0
 1763  1764  1765 -201  1768 0

c  1+1 --> 2
c    (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0 ∧  p_201) -> (-b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0)
c  in CNF:
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_2
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨  b^{1, 202}_1
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ -p_201 ∨ -b^{1, 202}_0
c  in DIMACS:
 1763  1764 -1765 -201 -1766 0
 1763  1764 -1765 -201  1767 0
 1763  1764 -1765 -201 -1768 0

c  2+1 --> break 
c    (-b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧  p_201) -> break
c  in CNF:
c     b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ -p_201 ∨ break
c  in DIMACS:
 1763 -1764  1765 -201 1162 0


c  2-1 --> 1
c    (-b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧ -p_201) -> (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0)
c  in CNF:
c     b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_2
c     b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_1
c     b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨  b^{1, 202}_0
c  in DIMACS:
 1763 -1764  1765  201 -1766 0
 1763 -1764  1765  201 -1767 0
 1763 -1764  1765  201  1768 0

c  1-1 --> 0
c    (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0 ∧ -p_201) -> (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧ -b^{1, 202}_0)
c  in CNF:
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_2
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_1
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_0
c  in DIMACS:
 1763  1764 -1765  201 -1766 0
 1763  1764 -1765  201 -1767 0
 1763  1764 -1765  201 -1768 0

c  0-1 --> -1
c    (-b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧ -p_201) -> ( b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0)
c  in CNF:
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨  b^{1, 202}_2
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_1
c     b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨  b^{1, 202}_0
c  in DIMACS:
 1763  1764  1765  201  1766 0
 1763  1764  1765  201 -1767 0
 1763  1764  1765  201  1768 0

c  -1-1 --> -2
c    ( b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧  b^{1, 201}_0 ∧ -p_201) -> ( b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0)
c  in CNF:
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨  b^{1, 202}_2
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨  b^{1, 202}_1
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨  p_201 ∨ -b^{1, 202}_0
c  in DIMACS:
-1763  1764 -1765  201  1766 0
-1763  1764 -1765  201  1767 0
-1763  1764 -1765  201 -1768 0

c  -2-1 --> break 
c    ( b^{1, 201}_2 ∧  b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧ -p_201) -> break
c  in CNF:
c    -b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨  b^{1, 201}_0 ∨  p_201 ∨ break
c  in DIMACS:
-1763 -1764  1765  201 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 201}_2 ∧ -b^{1, 201}_1 ∧ -b^{1, 201}_0 ∧ true) 
c  in CNF:
c    -b^{1, 201}_2 ∨  b^{1, 201}_1 ∨  b^{1, 201}_0 ∨ false 
c  in DIMACS:
-1763  1764  1765  0

c  3 does not represent an automaton state.
c    -(-b^{1, 201}_2 ∧  b^{1, 201}_1 ∧  b^{1, 201}_0 ∧ true) 
c  in CNF:
c     b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ false 
c  in DIMACS:
 1763 -1764 -1765  0
c  -3 does not represent an automaton state.
c    -( b^{1, 201}_2 ∧  b^{1, 201}_1 ∧  b^{1, 201}_0 ∧ true) 
c  in CNF:
c    -b^{1, 201}_2 ∨ -b^{1, 201}_1 ∨ -b^{1, 201}_0 ∨ false 
c  in DIMACS:
-1763 -1764 -1765  0

c i = 202
c  -2+1 --> -1
c    ( b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧  p_202) -> ( b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0)
c  in CNF:
c    -b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨  b^{1, 203}_2
c    -b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_1
c    -b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨  b^{1, 203}_0
c  in DIMACS:
-1766 -1767  1768 -202  1769 0
-1766 -1767  1768 -202 -1770 0
-1766 -1767  1768 -202  1771 0

c  -1+1 --> 0
c    ( b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0 ∧  p_202) -> (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧ -b^{1, 203}_0)
c  in CNF:
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_2
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_1
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_0
c  in DIMACS:
-1766  1767 -1768 -202 -1769 0
-1766  1767 -1768 -202 -1770 0
-1766  1767 -1768 -202 -1771 0

c  0+1 --> 1
c    (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧  p_202) -> (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0)
c  in CNF:
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_2
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_1
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨  b^{1, 203}_0
c  in DIMACS:
 1766  1767  1768 -202 -1769 0
 1766  1767  1768 -202 -1770 0
 1766  1767  1768 -202  1771 0

c  1+1 --> 2
c    (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0 ∧  p_202) -> (-b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0)
c  in CNF:
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_2
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨  b^{1, 203}_1
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ -p_202 ∨ -b^{1, 203}_0
c  in DIMACS:
 1766  1767 -1768 -202 -1769 0
 1766  1767 -1768 -202  1770 0
 1766  1767 -1768 -202 -1771 0

c  2+1 --> break 
c    (-b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧  p_202) -> break
c  in CNF:
c     b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ -p_202 ∨ break
c  in DIMACS:
 1766 -1767  1768 -202 1162 0


c  2-1 --> 1
c    (-b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧ -p_202) -> (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0)
c  in CNF:
c     b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_2
c     b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_1
c     b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨  b^{1, 203}_0
c  in DIMACS:
 1766 -1767  1768  202 -1769 0
 1766 -1767  1768  202 -1770 0
 1766 -1767  1768  202  1771 0

c  1-1 --> 0
c    (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0 ∧ -p_202) -> (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧ -b^{1, 203}_0)
c  in CNF:
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_2
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_1
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_0
c  in DIMACS:
 1766  1767 -1768  202 -1769 0
 1766  1767 -1768  202 -1770 0
 1766  1767 -1768  202 -1771 0

c  0-1 --> -1
c    (-b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧ -p_202) -> ( b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0)
c  in CNF:
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨  b^{1, 203}_2
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_1
c     b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨  b^{1, 203}_0
c  in DIMACS:
 1766  1767  1768  202  1769 0
 1766  1767  1768  202 -1770 0
 1766  1767  1768  202  1771 0

c  -1-1 --> -2
c    ( b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧  b^{1, 202}_0 ∧ -p_202) -> ( b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0)
c  in CNF:
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨  b^{1, 203}_2
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨  b^{1, 203}_1
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨  p_202 ∨ -b^{1, 203}_0
c  in DIMACS:
-1766  1767 -1768  202  1769 0
-1766  1767 -1768  202  1770 0
-1766  1767 -1768  202 -1771 0

c  -2-1 --> break 
c    ( b^{1, 202}_2 ∧  b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧ -p_202) -> break
c  in CNF:
c    -b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨  b^{1, 202}_0 ∨  p_202 ∨ break
c  in DIMACS:
-1766 -1767  1768  202 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 202}_2 ∧ -b^{1, 202}_1 ∧ -b^{1, 202}_0 ∧ true) 
c  in CNF:
c    -b^{1, 202}_2 ∨  b^{1, 202}_1 ∨  b^{1, 202}_0 ∨ false 
c  in DIMACS:
-1766  1767  1768  0

c  3 does not represent an automaton state.
c    -(-b^{1, 202}_2 ∧  b^{1, 202}_1 ∧  b^{1, 202}_0 ∧ true) 
c  in CNF:
c     b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ false 
c  in DIMACS:
 1766 -1767 -1768  0
c  -3 does not represent an automaton state.
c    -( b^{1, 202}_2 ∧  b^{1, 202}_1 ∧  b^{1, 202}_0 ∧ true) 
c  in CNF:
c    -b^{1, 202}_2 ∨ -b^{1, 202}_1 ∨ -b^{1, 202}_0 ∨ false 
c  in DIMACS:
-1766 -1767 -1768  0

c i = 203
c  -2+1 --> -1
c    ( b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧  p_203) -> ( b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0)
c  in CNF:
c    -b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨  b^{1, 204}_2
c    -b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_1
c    -b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨  b^{1, 204}_0
c  in DIMACS:
-1769 -1770  1771 -203  1772 0
-1769 -1770  1771 -203 -1773 0
-1769 -1770  1771 -203  1774 0

c  -1+1 --> 0
c    ( b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0 ∧  p_203) -> (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧ -b^{1, 204}_0)
c  in CNF:
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_2
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_1
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_0
c  in DIMACS:
-1769  1770 -1771 -203 -1772 0
-1769  1770 -1771 -203 -1773 0
-1769  1770 -1771 -203 -1774 0

c  0+1 --> 1
c    (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧  p_203) -> (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0)
c  in CNF:
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_2
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_1
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨  b^{1, 204}_0
c  in DIMACS:
 1769  1770  1771 -203 -1772 0
 1769  1770  1771 -203 -1773 0
 1769  1770  1771 -203  1774 0

c  1+1 --> 2
c    (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0 ∧  p_203) -> (-b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0)
c  in CNF:
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_2
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨  b^{1, 204}_1
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ -p_203 ∨ -b^{1, 204}_0
c  in DIMACS:
 1769  1770 -1771 -203 -1772 0
 1769  1770 -1771 -203  1773 0
 1769  1770 -1771 -203 -1774 0

c  2+1 --> break 
c    (-b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧  p_203) -> break
c  in CNF:
c     b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ -p_203 ∨ break
c  in DIMACS:
 1769 -1770  1771 -203 1162 0


c  2-1 --> 1
c    (-b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧ -p_203) -> (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0)
c  in CNF:
c     b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_2
c     b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_1
c     b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨  b^{1, 204}_0
c  in DIMACS:
 1769 -1770  1771  203 -1772 0
 1769 -1770  1771  203 -1773 0
 1769 -1770  1771  203  1774 0

c  1-1 --> 0
c    (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0 ∧ -p_203) -> (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧ -b^{1, 204}_0)
c  in CNF:
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_2
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_1
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_0
c  in DIMACS:
 1769  1770 -1771  203 -1772 0
 1769  1770 -1771  203 -1773 0
 1769  1770 -1771  203 -1774 0

c  0-1 --> -1
c    (-b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧ -p_203) -> ( b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0)
c  in CNF:
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨  b^{1, 204}_2
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_1
c     b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨  b^{1, 204}_0
c  in DIMACS:
 1769  1770  1771  203  1772 0
 1769  1770  1771  203 -1773 0
 1769  1770  1771  203  1774 0

c  -1-1 --> -2
c    ( b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧  b^{1, 203}_0 ∧ -p_203) -> ( b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0)
c  in CNF:
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨  b^{1, 204}_2
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨  b^{1, 204}_1
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨  p_203 ∨ -b^{1, 204}_0
c  in DIMACS:
-1769  1770 -1771  203  1772 0
-1769  1770 -1771  203  1773 0
-1769  1770 -1771  203 -1774 0

c  -2-1 --> break 
c    ( b^{1, 203}_2 ∧  b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧ -p_203) -> break
c  in CNF:
c    -b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨  b^{1, 203}_0 ∨  p_203 ∨ break
c  in DIMACS:
-1769 -1770  1771  203 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 203}_2 ∧ -b^{1, 203}_1 ∧ -b^{1, 203}_0 ∧ true) 
c  in CNF:
c    -b^{1, 203}_2 ∨  b^{1, 203}_1 ∨  b^{1, 203}_0 ∨ false 
c  in DIMACS:
-1769  1770  1771  0

c  3 does not represent an automaton state.
c    -(-b^{1, 203}_2 ∧  b^{1, 203}_1 ∧  b^{1, 203}_0 ∧ true) 
c  in CNF:
c     b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ false 
c  in DIMACS:
 1769 -1770 -1771  0
c  -3 does not represent an automaton state.
c    -( b^{1, 203}_2 ∧  b^{1, 203}_1 ∧  b^{1, 203}_0 ∧ true) 
c  in CNF:
c    -b^{1, 203}_2 ∨ -b^{1, 203}_1 ∨ -b^{1, 203}_0 ∨ false 
c  in DIMACS:
-1769 -1770 -1771  0

c i = 204
c  -2+1 --> -1
c    ( b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧  p_204) -> ( b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0)
c  in CNF:
c    -b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨  b^{1, 205}_2
c    -b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_1
c    -b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨  b^{1, 205}_0
c  in DIMACS:
-1772 -1773  1774 -204  1775 0
-1772 -1773  1774 -204 -1776 0
-1772 -1773  1774 -204  1777 0

c  -1+1 --> 0
c    ( b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0 ∧  p_204) -> (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧ -b^{1, 205}_0)
c  in CNF:
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_2
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_1
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_0
c  in DIMACS:
-1772  1773 -1774 -204 -1775 0
-1772  1773 -1774 -204 -1776 0
-1772  1773 -1774 -204 -1777 0

c  0+1 --> 1
c    (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧  p_204) -> (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0)
c  in CNF:
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_2
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_1
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨  b^{1, 205}_0
c  in DIMACS:
 1772  1773  1774 -204 -1775 0
 1772  1773  1774 -204 -1776 0
 1772  1773  1774 -204  1777 0

c  1+1 --> 2
c    (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0 ∧  p_204) -> (-b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0)
c  in CNF:
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_2
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨  b^{1, 205}_1
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ -p_204 ∨ -b^{1, 205}_0
c  in DIMACS:
 1772  1773 -1774 -204 -1775 0
 1772  1773 -1774 -204  1776 0
 1772  1773 -1774 -204 -1777 0

c  2+1 --> break 
c    (-b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧  p_204) -> break
c  in CNF:
c     b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 1772 -1773  1774 -204 1162 0


c  2-1 --> 1
c    (-b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧ -p_204) -> (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0)
c  in CNF:
c     b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_2
c     b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_1
c     b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨  b^{1, 205}_0
c  in DIMACS:
 1772 -1773  1774  204 -1775 0
 1772 -1773  1774  204 -1776 0
 1772 -1773  1774  204  1777 0

c  1-1 --> 0
c    (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0 ∧ -p_204) -> (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧ -b^{1, 205}_0)
c  in CNF:
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_2
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_1
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_0
c  in DIMACS:
 1772  1773 -1774  204 -1775 0
 1772  1773 -1774  204 -1776 0
 1772  1773 -1774  204 -1777 0

c  0-1 --> -1
c    (-b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧ -p_204) -> ( b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0)
c  in CNF:
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨  b^{1, 205}_2
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_1
c     b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨  b^{1, 205}_0
c  in DIMACS:
 1772  1773  1774  204  1775 0
 1772  1773  1774  204 -1776 0
 1772  1773  1774  204  1777 0

c  -1-1 --> -2
c    ( b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧  b^{1, 204}_0 ∧ -p_204) -> ( b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0)
c  in CNF:
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨  b^{1, 205}_2
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨  b^{1, 205}_1
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨  p_204 ∨ -b^{1, 205}_0
c  in DIMACS:
-1772  1773 -1774  204  1775 0
-1772  1773 -1774  204  1776 0
-1772  1773 -1774  204 -1777 0

c  -2-1 --> break 
c    ( b^{1, 204}_2 ∧  b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨  b^{1, 204}_0 ∨  p_204 ∨ break
c  in DIMACS:
-1772 -1773  1774  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 204}_2 ∧ -b^{1, 204}_1 ∧ -b^{1, 204}_0 ∧ true) 
c  in CNF:
c    -b^{1, 204}_2 ∨  b^{1, 204}_1 ∨  b^{1, 204}_0 ∨ false 
c  in DIMACS:
-1772  1773  1774  0

c  3 does not represent an automaton state.
c    -(-b^{1, 204}_2 ∧  b^{1, 204}_1 ∧  b^{1, 204}_0 ∧ true) 
c  in CNF:
c     b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ false 
c  in DIMACS:
 1772 -1773 -1774  0
c  -3 does not represent an automaton state.
c    -( b^{1, 204}_2 ∧  b^{1, 204}_1 ∧  b^{1, 204}_0 ∧ true) 
c  in CNF:
c    -b^{1, 204}_2 ∨ -b^{1, 204}_1 ∨ -b^{1, 204}_0 ∨ false 
c  in DIMACS:
-1772 -1773 -1774  0

c i = 205
c  -2+1 --> -1
c    ( b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧  p_205) -> ( b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0)
c  in CNF:
c    -b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨  b^{1, 206}_2
c    -b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_1
c    -b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨  b^{1, 206}_0
c  in DIMACS:
-1775 -1776  1777 -205  1778 0
-1775 -1776  1777 -205 -1779 0
-1775 -1776  1777 -205  1780 0

c  -1+1 --> 0
c    ( b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0 ∧  p_205) -> (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧ -b^{1, 206}_0)
c  in CNF:
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_2
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_1
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_0
c  in DIMACS:
-1775  1776 -1777 -205 -1778 0
-1775  1776 -1777 -205 -1779 0
-1775  1776 -1777 -205 -1780 0

c  0+1 --> 1
c    (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧  p_205) -> (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0)
c  in CNF:
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_2
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_1
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨  b^{1, 206}_0
c  in DIMACS:
 1775  1776  1777 -205 -1778 0
 1775  1776  1777 -205 -1779 0
 1775  1776  1777 -205  1780 0

c  1+1 --> 2
c    (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0 ∧  p_205) -> (-b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0)
c  in CNF:
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_2
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨  b^{1, 206}_1
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ -p_205 ∨ -b^{1, 206}_0
c  in DIMACS:
 1775  1776 -1777 -205 -1778 0
 1775  1776 -1777 -205  1779 0
 1775  1776 -1777 -205 -1780 0

c  2+1 --> break 
c    (-b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧  p_205) -> break
c  in CNF:
c     b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ -p_205 ∨ break
c  in DIMACS:
 1775 -1776  1777 -205 1162 0


c  2-1 --> 1
c    (-b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧ -p_205) -> (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0)
c  in CNF:
c     b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_2
c     b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_1
c     b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨  b^{1, 206}_0
c  in DIMACS:
 1775 -1776  1777  205 -1778 0
 1775 -1776  1777  205 -1779 0
 1775 -1776  1777  205  1780 0

c  1-1 --> 0
c    (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0 ∧ -p_205) -> (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧ -b^{1, 206}_0)
c  in CNF:
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_2
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_1
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_0
c  in DIMACS:
 1775  1776 -1777  205 -1778 0
 1775  1776 -1777  205 -1779 0
 1775  1776 -1777  205 -1780 0

c  0-1 --> -1
c    (-b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧ -p_205) -> ( b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0)
c  in CNF:
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨  b^{1, 206}_2
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_1
c     b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨  b^{1, 206}_0
c  in DIMACS:
 1775  1776  1777  205  1778 0
 1775  1776  1777  205 -1779 0
 1775  1776  1777  205  1780 0

c  -1-1 --> -2
c    ( b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧  b^{1, 205}_0 ∧ -p_205) -> ( b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0)
c  in CNF:
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨  b^{1, 206}_2
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨  b^{1, 206}_1
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨  p_205 ∨ -b^{1, 206}_0
c  in DIMACS:
-1775  1776 -1777  205  1778 0
-1775  1776 -1777  205  1779 0
-1775  1776 -1777  205 -1780 0

c  -2-1 --> break 
c    ( b^{1, 205}_2 ∧  b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧ -p_205) -> break
c  in CNF:
c    -b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨  b^{1, 205}_0 ∨  p_205 ∨ break
c  in DIMACS:
-1775 -1776  1777  205 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 205}_2 ∧ -b^{1, 205}_1 ∧ -b^{1, 205}_0 ∧ true) 
c  in CNF:
c    -b^{1, 205}_2 ∨  b^{1, 205}_1 ∨  b^{1, 205}_0 ∨ false 
c  in DIMACS:
-1775  1776  1777  0

c  3 does not represent an automaton state.
c    -(-b^{1, 205}_2 ∧  b^{1, 205}_1 ∧  b^{1, 205}_0 ∧ true) 
c  in CNF:
c     b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ false 
c  in DIMACS:
 1775 -1776 -1777  0
c  -3 does not represent an automaton state.
c    -( b^{1, 205}_2 ∧  b^{1, 205}_1 ∧  b^{1, 205}_0 ∧ true) 
c  in CNF:
c    -b^{1, 205}_2 ∨ -b^{1, 205}_1 ∨ -b^{1, 205}_0 ∨ false 
c  in DIMACS:
-1775 -1776 -1777  0

c i = 206
c  -2+1 --> -1
c    ( b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧  p_206) -> ( b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0)
c  in CNF:
c    -b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨  b^{1, 207}_2
c    -b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_1
c    -b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨  b^{1, 207}_0
c  in DIMACS:
-1778 -1779  1780 -206  1781 0
-1778 -1779  1780 -206 -1782 0
-1778 -1779  1780 -206  1783 0

c  -1+1 --> 0
c    ( b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0 ∧  p_206) -> (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧ -b^{1, 207}_0)
c  in CNF:
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_2
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_1
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_0
c  in DIMACS:
-1778  1779 -1780 -206 -1781 0
-1778  1779 -1780 -206 -1782 0
-1778  1779 -1780 -206 -1783 0

c  0+1 --> 1
c    (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧  p_206) -> (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0)
c  in CNF:
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_2
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_1
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨  b^{1, 207}_0
c  in DIMACS:
 1778  1779  1780 -206 -1781 0
 1778  1779  1780 -206 -1782 0
 1778  1779  1780 -206  1783 0

c  1+1 --> 2
c    (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0 ∧  p_206) -> (-b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0)
c  in CNF:
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_2
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨  b^{1, 207}_1
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ -p_206 ∨ -b^{1, 207}_0
c  in DIMACS:
 1778  1779 -1780 -206 -1781 0
 1778  1779 -1780 -206  1782 0
 1778  1779 -1780 -206 -1783 0

c  2+1 --> break 
c    (-b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧  p_206) -> break
c  in CNF:
c     b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ -p_206 ∨ break
c  in DIMACS:
 1778 -1779  1780 -206 1162 0


c  2-1 --> 1
c    (-b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧ -p_206) -> (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0)
c  in CNF:
c     b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_2
c     b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_1
c     b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨  b^{1, 207}_0
c  in DIMACS:
 1778 -1779  1780  206 -1781 0
 1778 -1779  1780  206 -1782 0
 1778 -1779  1780  206  1783 0

c  1-1 --> 0
c    (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0 ∧ -p_206) -> (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧ -b^{1, 207}_0)
c  in CNF:
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_2
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_1
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_0
c  in DIMACS:
 1778  1779 -1780  206 -1781 0
 1778  1779 -1780  206 -1782 0
 1778  1779 -1780  206 -1783 0

c  0-1 --> -1
c    (-b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧ -p_206) -> ( b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0)
c  in CNF:
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨  b^{1, 207}_2
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_1
c     b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨  b^{1, 207}_0
c  in DIMACS:
 1778  1779  1780  206  1781 0
 1778  1779  1780  206 -1782 0
 1778  1779  1780  206  1783 0

c  -1-1 --> -2
c    ( b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧  b^{1, 206}_0 ∧ -p_206) -> ( b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0)
c  in CNF:
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨  b^{1, 207}_2
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨  b^{1, 207}_1
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨  p_206 ∨ -b^{1, 207}_0
c  in DIMACS:
-1778  1779 -1780  206  1781 0
-1778  1779 -1780  206  1782 0
-1778  1779 -1780  206 -1783 0

c  -2-1 --> break 
c    ( b^{1, 206}_2 ∧  b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧ -p_206) -> break
c  in CNF:
c    -b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨  b^{1, 206}_0 ∨  p_206 ∨ break
c  in DIMACS:
-1778 -1779  1780  206 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 206}_2 ∧ -b^{1, 206}_1 ∧ -b^{1, 206}_0 ∧ true) 
c  in CNF:
c    -b^{1, 206}_2 ∨  b^{1, 206}_1 ∨  b^{1, 206}_0 ∨ false 
c  in DIMACS:
-1778  1779  1780  0

c  3 does not represent an automaton state.
c    -(-b^{1, 206}_2 ∧  b^{1, 206}_1 ∧  b^{1, 206}_0 ∧ true) 
c  in CNF:
c     b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ false 
c  in DIMACS:
 1778 -1779 -1780  0
c  -3 does not represent an automaton state.
c    -( b^{1, 206}_2 ∧  b^{1, 206}_1 ∧  b^{1, 206}_0 ∧ true) 
c  in CNF:
c    -b^{1, 206}_2 ∨ -b^{1, 206}_1 ∨ -b^{1, 206}_0 ∨ false 
c  in DIMACS:
-1778 -1779 -1780  0

c i = 207
c  -2+1 --> -1
c    ( b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧  p_207) -> ( b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0)
c  in CNF:
c    -b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨  b^{1, 208}_2
c    -b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_1
c    -b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨  b^{1, 208}_0
c  in DIMACS:
-1781 -1782  1783 -207  1784 0
-1781 -1782  1783 -207 -1785 0
-1781 -1782  1783 -207  1786 0

c  -1+1 --> 0
c    ( b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0 ∧  p_207) -> (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧ -b^{1, 208}_0)
c  in CNF:
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_2
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_1
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_0
c  in DIMACS:
-1781  1782 -1783 -207 -1784 0
-1781  1782 -1783 -207 -1785 0
-1781  1782 -1783 -207 -1786 0

c  0+1 --> 1
c    (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧  p_207) -> (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0)
c  in CNF:
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_2
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_1
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨  b^{1, 208}_0
c  in DIMACS:
 1781  1782  1783 -207 -1784 0
 1781  1782  1783 -207 -1785 0
 1781  1782  1783 -207  1786 0

c  1+1 --> 2
c    (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0 ∧  p_207) -> (-b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0)
c  in CNF:
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_2
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨  b^{1, 208}_1
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ -p_207 ∨ -b^{1, 208}_0
c  in DIMACS:
 1781  1782 -1783 -207 -1784 0
 1781  1782 -1783 -207  1785 0
 1781  1782 -1783 -207 -1786 0

c  2+1 --> break 
c    (-b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧  p_207) -> break
c  in CNF:
c     b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 1781 -1782  1783 -207 1162 0


c  2-1 --> 1
c    (-b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧ -p_207) -> (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0)
c  in CNF:
c     b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_2
c     b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_1
c     b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨  b^{1, 208}_0
c  in DIMACS:
 1781 -1782  1783  207 -1784 0
 1781 -1782  1783  207 -1785 0
 1781 -1782  1783  207  1786 0

c  1-1 --> 0
c    (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0 ∧ -p_207) -> (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧ -b^{1, 208}_0)
c  in CNF:
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_2
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_1
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_0
c  in DIMACS:
 1781  1782 -1783  207 -1784 0
 1781  1782 -1783  207 -1785 0
 1781  1782 -1783  207 -1786 0

c  0-1 --> -1
c    (-b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧ -p_207) -> ( b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0)
c  in CNF:
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨  b^{1, 208}_2
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_1
c     b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨  b^{1, 208}_0
c  in DIMACS:
 1781  1782  1783  207  1784 0
 1781  1782  1783  207 -1785 0
 1781  1782  1783  207  1786 0

c  -1-1 --> -2
c    ( b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧  b^{1, 207}_0 ∧ -p_207) -> ( b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0)
c  in CNF:
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨  b^{1, 208}_2
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨  b^{1, 208}_1
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨  p_207 ∨ -b^{1, 208}_0
c  in DIMACS:
-1781  1782 -1783  207  1784 0
-1781  1782 -1783  207  1785 0
-1781  1782 -1783  207 -1786 0

c  -2-1 --> break 
c    ( b^{1, 207}_2 ∧  b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨  b^{1, 207}_0 ∨  p_207 ∨ break
c  in DIMACS:
-1781 -1782  1783  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 207}_2 ∧ -b^{1, 207}_1 ∧ -b^{1, 207}_0 ∧ true) 
c  in CNF:
c    -b^{1, 207}_2 ∨  b^{1, 207}_1 ∨  b^{1, 207}_0 ∨ false 
c  in DIMACS:
-1781  1782  1783  0

c  3 does not represent an automaton state.
c    -(-b^{1, 207}_2 ∧  b^{1, 207}_1 ∧  b^{1, 207}_0 ∧ true) 
c  in CNF:
c     b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ false 
c  in DIMACS:
 1781 -1782 -1783  0
c  -3 does not represent an automaton state.
c    -( b^{1, 207}_2 ∧  b^{1, 207}_1 ∧  b^{1, 207}_0 ∧ true) 
c  in CNF:
c    -b^{1, 207}_2 ∨ -b^{1, 207}_1 ∨ -b^{1, 207}_0 ∨ false 
c  in DIMACS:
-1781 -1782 -1783  0

c i = 208
c  -2+1 --> -1
c    ( b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧  p_208) -> ( b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0)
c  in CNF:
c    -b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨  b^{1, 209}_2
c    -b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_1
c    -b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨  b^{1, 209}_0
c  in DIMACS:
-1784 -1785  1786 -208  1787 0
-1784 -1785  1786 -208 -1788 0
-1784 -1785  1786 -208  1789 0

c  -1+1 --> 0
c    ( b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0 ∧  p_208) -> (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧ -b^{1, 209}_0)
c  in CNF:
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_2
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_1
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_0
c  in DIMACS:
-1784  1785 -1786 -208 -1787 0
-1784  1785 -1786 -208 -1788 0
-1784  1785 -1786 -208 -1789 0

c  0+1 --> 1
c    (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧  p_208) -> (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0)
c  in CNF:
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_2
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_1
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨  b^{1, 209}_0
c  in DIMACS:
 1784  1785  1786 -208 -1787 0
 1784  1785  1786 -208 -1788 0
 1784  1785  1786 -208  1789 0

c  1+1 --> 2
c    (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0 ∧  p_208) -> (-b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0)
c  in CNF:
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_2
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨  b^{1, 209}_1
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ -p_208 ∨ -b^{1, 209}_0
c  in DIMACS:
 1784  1785 -1786 -208 -1787 0
 1784  1785 -1786 -208  1788 0
 1784  1785 -1786 -208 -1789 0

c  2+1 --> break 
c    (-b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧  p_208) -> break
c  in CNF:
c     b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 1784 -1785  1786 -208 1162 0


c  2-1 --> 1
c    (-b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧ -p_208) -> (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0)
c  in CNF:
c     b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_2
c     b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_1
c     b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨  b^{1, 209}_0
c  in DIMACS:
 1784 -1785  1786  208 -1787 0
 1784 -1785  1786  208 -1788 0
 1784 -1785  1786  208  1789 0

c  1-1 --> 0
c    (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0 ∧ -p_208) -> (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧ -b^{1, 209}_0)
c  in CNF:
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_2
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_1
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_0
c  in DIMACS:
 1784  1785 -1786  208 -1787 0
 1784  1785 -1786  208 -1788 0
 1784  1785 -1786  208 -1789 0

c  0-1 --> -1
c    (-b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧ -p_208) -> ( b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0)
c  in CNF:
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨  b^{1, 209}_2
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_1
c     b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨  b^{1, 209}_0
c  in DIMACS:
 1784  1785  1786  208  1787 0
 1784  1785  1786  208 -1788 0
 1784  1785  1786  208  1789 0

c  -1-1 --> -2
c    ( b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧  b^{1, 208}_0 ∧ -p_208) -> ( b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0)
c  in CNF:
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨  b^{1, 209}_2
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨  b^{1, 209}_1
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨  p_208 ∨ -b^{1, 209}_0
c  in DIMACS:
-1784  1785 -1786  208  1787 0
-1784  1785 -1786  208  1788 0
-1784  1785 -1786  208 -1789 0

c  -2-1 --> break 
c    ( b^{1, 208}_2 ∧  b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨  b^{1, 208}_0 ∨  p_208 ∨ break
c  in DIMACS:
-1784 -1785  1786  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 208}_2 ∧ -b^{1, 208}_1 ∧ -b^{1, 208}_0 ∧ true) 
c  in CNF:
c    -b^{1, 208}_2 ∨  b^{1, 208}_1 ∨  b^{1, 208}_0 ∨ false 
c  in DIMACS:
-1784  1785  1786  0

c  3 does not represent an automaton state.
c    -(-b^{1, 208}_2 ∧  b^{1, 208}_1 ∧  b^{1, 208}_0 ∧ true) 
c  in CNF:
c     b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ false 
c  in DIMACS:
 1784 -1785 -1786  0
c  -3 does not represent an automaton state.
c    -( b^{1, 208}_2 ∧  b^{1, 208}_1 ∧  b^{1, 208}_0 ∧ true) 
c  in CNF:
c    -b^{1, 208}_2 ∨ -b^{1, 208}_1 ∨ -b^{1, 208}_0 ∨ false 
c  in DIMACS:
-1784 -1785 -1786  0

c i = 209
c  -2+1 --> -1
c    ( b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧  p_209) -> ( b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0)
c  in CNF:
c    -b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨  b^{1, 210}_2
c    -b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_1
c    -b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨  b^{1, 210}_0
c  in DIMACS:
-1787 -1788  1789 -209  1790 0
-1787 -1788  1789 -209 -1791 0
-1787 -1788  1789 -209  1792 0

c  -1+1 --> 0
c    ( b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0 ∧  p_209) -> (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧ -b^{1, 210}_0)
c  in CNF:
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_2
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_1
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_0
c  in DIMACS:
-1787  1788 -1789 -209 -1790 0
-1787  1788 -1789 -209 -1791 0
-1787  1788 -1789 -209 -1792 0

c  0+1 --> 1
c    (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧  p_209) -> (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0)
c  in CNF:
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_2
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_1
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨  b^{1, 210}_0
c  in DIMACS:
 1787  1788  1789 -209 -1790 0
 1787  1788  1789 -209 -1791 0
 1787  1788  1789 -209  1792 0

c  1+1 --> 2
c    (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0 ∧  p_209) -> (-b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0)
c  in CNF:
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_2
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨  b^{1, 210}_1
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ -p_209 ∨ -b^{1, 210}_0
c  in DIMACS:
 1787  1788 -1789 -209 -1790 0
 1787  1788 -1789 -209  1791 0
 1787  1788 -1789 -209 -1792 0

c  2+1 --> break 
c    (-b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧  p_209) -> break
c  in CNF:
c     b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ -p_209 ∨ break
c  in DIMACS:
 1787 -1788  1789 -209 1162 0


c  2-1 --> 1
c    (-b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧ -p_209) -> (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0)
c  in CNF:
c     b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_2
c     b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_1
c     b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨  b^{1, 210}_0
c  in DIMACS:
 1787 -1788  1789  209 -1790 0
 1787 -1788  1789  209 -1791 0
 1787 -1788  1789  209  1792 0

c  1-1 --> 0
c    (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0 ∧ -p_209) -> (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧ -b^{1, 210}_0)
c  in CNF:
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_2
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_1
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_0
c  in DIMACS:
 1787  1788 -1789  209 -1790 0
 1787  1788 -1789  209 -1791 0
 1787  1788 -1789  209 -1792 0

c  0-1 --> -1
c    (-b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧ -p_209) -> ( b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0)
c  in CNF:
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨  b^{1, 210}_2
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_1
c     b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨  b^{1, 210}_0
c  in DIMACS:
 1787  1788  1789  209  1790 0
 1787  1788  1789  209 -1791 0
 1787  1788  1789  209  1792 0

c  -1-1 --> -2
c    ( b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧  b^{1, 209}_0 ∧ -p_209) -> ( b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0)
c  in CNF:
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨  b^{1, 210}_2
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨  b^{1, 210}_1
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨  p_209 ∨ -b^{1, 210}_0
c  in DIMACS:
-1787  1788 -1789  209  1790 0
-1787  1788 -1789  209  1791 0
-1787  1788 -1789  209 -1792 0

c  -2-1 --> break 
c    ( b^{1, 209}_2 ∧  b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧ -p_209) -> break
c  in CNF:
c    -b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨  b^{1, 209}_0 ∨  p_209 ∨ break
c  in DIMACS:
-1787 -1788  1789  209 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 209}_2 ∧ -b^{1, 209}_1 ∧ -b^{1, 209}_0 ∧ true) 
c  in CNF:
c    -b^{1, 209}_2 ∨  b^{1, 209}_1 ∨  b^{1, 209}_0 ∨ false 
c  in DIMACS:
-1787  1788  1789  0

c  3 does not represent an automaton state.
c    -(-b^{1, 209}_2 ∧  b^{1, 209}_1 ∧  b^{1, 209}_0 ∧ true) 
c  in CNF:
c     b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ false 
c  in DIMACS:
 1787 -1788 -1789  0
c  -3 does not represent an automaton state.
c    -( b^{1, 209}_2 ∧  b^{1, 209}_1 ∧  b^{1, 209}_0 ∧ true) 
c  in CNF:
c    -b^{1, 209}_2 ∨ -b^{1, 209}_1 ∨ -b^{1, 209}_0 ∨ false 
c  in DIMACS:
-1787 -1788 -1789  0

c i = 210
c  -2+1 --> -1
c    ( b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧  p_210) -> ( b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0)
c  in CNF:
c    -b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨  b^{1, 211}_2
c    -b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_1
c    -b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨  b^{1, 211}_0
c  in DIMACS:
-1790 -1791  1792 -210  1793 0
-1790 -1791  1792 -210 -1794 0
-1790 -1791  1792 -210  1795 0

c  -1+1 --> 0
c    ( b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0 ∧  p_210) -> (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧ -b^{1, 211}_0)
c  in CNF:
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_2
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_1
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_0
c  in DIMACS:
-1790  1791 -1792 -210 -1793 0
-1790  1791 -1792 -210 -1794 0
-1790  1791 -1792 -210 -1795 0

c  0+1 --> 1
c    (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧  p_210) -> (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0)
c  in CNF:
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_2
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_1
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨  b^{1, 211}_0
c  in DIMACS:
 1790  1791  1792 -210 -1793 0
 1790  1791  1792 -210 -1794 0
 1790  1791  1792 -210  1795 0

c  1+1 --> 2
c    (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0 ∧  p_210) -> (-b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0)
c  in CNF:
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_2
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨  b^{1, 211}_1
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ -p_210 ∨ -b^{1, 211}_0
c  in DIMACS:
 1790  1791 -1792 -210 -1793 0
 1790  1791 -1792 -210  1794 0
 1790  1791 -1792 -210 -1795 0

c  2+1 --> break 
c    (-b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧  p_210) -> break
c  in CNF:
c     b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 1790 -1791  1792 -210 1162 0


c  2-1 --> 1
c    (-b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧ -p_210) -> (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0)
c  in CNF:
c     b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_2
c     b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_1
c     b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨  b^{1, 211}_0
c  in DIMACS:
 1790 -1791  1792  210 -1793 0
 1790 -1791  1792  210 -1794 0
 1790 -1791  1792  210  1795 0

c  1-1 --> 0
c    (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0 ∧ -p_210) -> (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧ -b^{1, 211}_0)
c  in CNF:
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_2
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_1
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_0
c  in DIMACS:
 1790  1791 -1792  210 -1793 0
 1790  1791 -1792  210 -1794 0
 1790  1791 -1792  210 -1795 0

c  0-1 --> -1
c    (-b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧ -p_210) -> ( b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0)
c  in CNF:
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨  b^{1, 211}_2
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_1
c     b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨  b^{1, 211}_0
c  in DIMACS:
 1790  1791  1792  210  1793 0
 1790  1791  1792  210 -1794 0
 1790  1791  1792  210  1795 0

c  -1-1 --> -2
c    ( b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧  b^{1, 210}_0 ∧ -p_210) -> ( b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0)
c  in CNF:
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨  b^{1, 211}_2
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨  b^{1, 211}_1
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨  p_210 ∨ -b^{1, 211}_0
c  in DIMACS:
-1790  1791 -1792  210  1793 0
-1790  1791 -1792  210  1794 0
-1790  1791 -1792  210 -1795 0

c  -2-1 --> break 
c    ( b^{1, 210}_2 ∧  b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨  b^{1, 210}_0 ∨  p_210 ∨ break
c  in DIMACS:
-1790 -1791  1792  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 210}_2 ∧ -b^{1, 210}_1 ∧ -b^{1, 210}_0 ∧ true) 
c  in CNF:
c    -b^{1, 210}_2 ∨  b^{1, 210}_1 ∨  b^{1, 210}_0 ∨ false 
c  in DIMACS:
-1790  1791  1792  0

c  3 does not represent an automaton state.
c    -(-b^{1, 210}_2 ∧  b^{1, 210}_1 ∧  b^{1, 210}_0 ∧ true) 
c  in CNF:
c     b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ false 
c  in DIMACS:
 1790 -1791 -1792  0
c  -3 does not represent an automaton state.
c    -( b^{1, 210}_2 ∧  b^{1, 210}_1 ∧  b^{1, 210}_0 ∧ true) 
c  in CNF:
c    -b^{1, 210}_2 ∨ -b^{1, 210}_1 ∨ -b^{1, 210}_0 ∨ false 
c  in DIMACS:
-1790 -1791 -1792  0

c i = 211
c  -2+1 --> -1
c    ( b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧  p_211) -> ( b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0)
c  in CNF:
c    -b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨  b^{1, 212}_2
c    -b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_1
c    -b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨  b^{1, 212}_0
c  in DIMACS:
-1793 -1794  1795 -211  1796 0
-1793 -1794  1795 -211 -1797 0
-1793 -1794  1795 -211  1798 0

c  -1+1 --> 0
c    ( b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0 ∧  p_211) -> (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧ -b^{1, 212}_0)
c  in CNF:
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_2
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_1
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_0
c  in DIMACS:
-1793  1794 -1795 -211 -1796 0
-1793  1794 -1795 -211 -1797 0
-1793  1794 -1795 -211 -1798 0

c  0+1 --> 1
c    (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧  p_211) -> (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0)
c  in CNF:
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_2
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_1
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨  b^{1, 212}_0
c  in DIMACS:
 1793  1794  1795 -211 -1796 0
 1793  1794  1795 -211 -1797 0
 1793  1794  1795 -211  1798 0

c  1+1 --> 2
c    (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0 ∧  p_211) -> (-b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0)
c  in CNF:
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_2
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨  b^{1, 212}_1
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ -p_211 ∨ -b^{1, 212}_0
c  in DIMACS:
 1793  1794 -1795 -211 -1796 0
 1793  1794 -1795 -211  1797 0
 1793  1794 -1795 -211 -1798 0

c  2+1 --> break 
c    (-b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧  p_211) -> break
c  in CNF:
c     b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ -p_211 ∨ break
c  in DIMACS:
 1793 -1794  1795 -211 1162 0


c  2-1 --> 1
c    (-b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧ -p_211) -> (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0)
c  in CNF:
c     b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_2
c     b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_1
c     b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨  b^{1, 212}_0
c  in DIMACS:
 1793 -1794  1795  211 -1796 0
 1793 -1794  1795  211 -1797 0
 1793 -1794  1795  211  1798 0

c  1-1 --> 0
c    (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0 ∧ -p_211) -> (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧ -b^{1, 212}_0)
c  in CNF:
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_2
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_1
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_0
c  in DIMACS:
 1793  1794 -1795  211 -1796 0
 1793  1794 -1795  211 -1797 0
 1793  1794 -1795  211 -1798 0

c  0-1 --> -1
c    (-b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧ -p_211) -> ( b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0)
c  in CNF:
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨  b^{1, 212}_2
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_1
c     b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨  b^{1, 212}_0
c  in DIMACS:
 1793  1794  1795  211  1796 0
 1793  1794  1795  211 -1797 0
 1793  1794  1795  211  1798 0

c  -1-1 --> -2
c    ( b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧  b^{1, 211}_0 ∧ -p_211) -> ( b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0)
c  in CNF:
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨  b^{1, 212}_2
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨  b^{1, 212}_1
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨  p_211 ∨ -b^{1, 212}_0
c  in DIMACS:
-1793  1794 -1795  211  1796 0
-1793  1794 -1795  211  1797 0
-1793  1794 -1795  211 -1798 0

c  -2-1 --> break 
c    ( b^{1, 211}_2 ∧  b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧ -p_211) -> break
c  in CNF:
c    -b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨  b^{1, 211}_0 ∨  p_211 ∨ break
c  in DIMACS:
-1793 -1794  1795  211 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 211}_2 ∧ -b^{1, 211}_1 ∧ -b^{1, 211}_0 ∧ true) 
c  in CNF:
c    -b^{1, 211}_2 ∨  b^{1, 211}_1 ∨  b^{1, 211}_0 ∨ false 
c  in DIMACS:
-1793  1794  1795  0

c  3 does not represent an automaton state.
c    -(-b^{1, 211}_2 ∧  b^{1, 211}_1 ∧  b^{1, 211}_0 ∧ true) 
c  in CNF:
c     b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ false 
c  in DIMACS:
 1793 -1794 -1795  0
c  -3 does not represent an automaton state.
c    -( b^{1, 211}_2 ∧  b^{1, 211}_1 ∧  b^{1, 211}_0 ∧ true) 
c  in CNF:
c    -b^{1, 211}_2 ∨ -b^{1, 211}_1 ∨ -b^{1, 211}_0 ∨ false 
c  in DIMACS:
-1793 -1794 -1795  0

c i = 212
c  -2+1 --> -1
c    ( b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧  p_212) -> ( b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0)
c  in CNF:
c    -b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨  b^{1, 213}_2
c    -b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_1
c    -b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨  b^{1, 213}_0
c  in DIMACS:
-1796 -1797  1798 -212  1799 0
-1796 -1797  1798 -212 -1800 0
-1796 -1797  1798 -212  1801 0

c  -1+1 --> 0
c    ( b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0 ∧  p_212) -> (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧ -b^{1, 213}_0)
c  in CNF:
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_2
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_1
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_0
c  in DIMACS:
-1796  1797 -1798 -212 -1799 0
-1796  1797 -1798 -212 -1800 0
-1796  1797 -1798 -212 -1801 0

c  0+1 --> 1
c    (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧  p_212) -> (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0)
c  in CNF:
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_2
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_1
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨  b^{1, 213}_0
c  in DIMACS:
 1796  1797  1798 -212 -1799 0
 1796  1797  1798 -212 -1800 0
 1796  1797  1798 -212  1801 0

c  1+1 --> 2
c    (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0 ∧  p_212) -> (-b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0)
c  in CNF:
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_2
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨  b^{1, 213}_1
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ -p_212 ∨ -b^{1, 213}_0
c  in DIMACS:
 1796  1797 -1798 -212 -1799 0
 1796  1797 -1798 -212  1800 0
 1796  1797 -1798 -212 -1801 0

c  2+1 --> break 
c    (-b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧  p_212) -> break
c  in CNF:
c     b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 1796 -1797  1798 -212 1162 0


c  2-1 --> 1
c    (-b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧ -p_212) -> (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0)
c  in CNF:
c     b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_2
c     b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_1
c     b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨  b^{1, 213}_0
c  in DIMACS:
 1796 -1797  1798  212 -1799 0
 1796 -1797  1798  212 -1800 0
 1796 -1797  1798  212  1801 0

c  1-1 --> 0
c    (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0 ∧ -p_212) -> (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧ -b^{1, 213}_0)
c  in CNF:
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_2
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_1
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_0
c  in DIMACS:
 1796  1797 -1798  212 -1799 0
 1796  1797 -1798  212 -1800 0
 1796  1797 -1798  212 -1801 0

c  0-1 --> -1
c    (-b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧ -p_212) -> ( b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0)
c  in CNF:
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨  b^{1, 213}_2
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_1
c     b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨  b^{1, 213}_0
c  in DIMACS:
 1796  1797  1798  212  1799 0
 1796  1797  1798  212 -1800 0
 1796  1797  1798  212  1801 0

c  -1-1 --> -2
c    ( b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧  b^{1, 212}_0 ∧ -p_212) -> ( b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0)
c  in CNF:
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨  b^{1, 213}_2
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨  b^{1, 213}_1
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨  p_212 ∨ -b^{1, 213}_0
c  in DIMACS:
-1796  1797 -1798  212  1799 0
-1796  1797 -1798  212  1800 0
-1796  1797 -1798  212 -1801 0

c  -2-1 --> break 
c    ( b^{1, 212}_2 ∧  b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨  b^{1, 212}_0 ∨  p_212 ∨ break
c  in DIMACS:
-1796 -1797  1798  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 212}_2 ∧ -b^{1, 212}_1 ∧ -b^{1, 212}_0 ∧ true) 
c  in CNF:
c    -b^{1, 212}_2 ∨  b^{1, 212}_1 ∨  b^{1, 212}_0 ∨ false 
c  in DIMACS:
-1796  1797  1798  0

c  3 does not represent an automaton state.
c    -(-b^{1, 212}_2 ∧  b^{1, 212}_1 ∧  b^{1, 212}_0 ∧ true) 
c  in CNF:
c     b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ false 
c  in DIMACS:
 1796 -1797 -1798  0
c  -3 does not represent an automaton state.
c    -( b^{1, 212}_2 ∧  b^{1, 212}_1 ∧  b^{1, 212}_0 ∧ true) 
c  in CNF:
c    -b^{1, 212}_2 ∨ -b^{1, 212}_1 ∨ -b^{1, 212}_0 ∨ false 
c  in DIMACS:
-1796 -1797 -1798  0

c i = 213
c  -2+1 --> -1
c    ( b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧  p_213) -> ( b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0)
c  in CNF:
c    -b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨  b^{1, 214}_2
c    -b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_1
c    -b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨  b^{1, 214}_0
c  in DIMACS:
-1799 -1800  1801 -213  1802 0
-1799 -1800  1801 -213 -1803 0
-1799 -1800  1801 -213  1804 0

c  -1+1 --> 0
c    ( b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0 ∧  p_213) -> (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧ -b^{1, 214}_0)
c  in CNF:
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_2
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_1
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_0
c  in DIMACS:
-1799  1800 -1801 -213 -1802 0
-1799  1800 -1801 -213 -1803 0
-1799  1800 -1801 -213 -1804 0

c  0+1 --> 1
c    (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧  p_213) -> (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0)
c  in CNF:
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_2
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_1
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨  b^{1, 214}_0
c  in DIMACS:
 1799  1800  1801 -213 -1802 0
 1799  1800  1801 -213 -1803 0
 1799  1800  1801 -213  1804 0

c  1+1 --> 2
c    (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0 ∧  p_213) -> (-b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0)
c  in CNF:
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_2
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨  b^{1, 214}_1
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ -p_213 ∨ -b^{1, 214}_0
c  in DIMACS:
 1799  1800 -1801 -213 -1802 0
 1799  1800 -1801 -213  1803 0
 1799  1800 -1801 -213 -1804 0

c  2+1 --> break 
c    (-b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧  p_213) -> break
c  in CNF:
c     b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ -p_213 ∨ break
c  in DIMACS:
 1799 -1800  1801 -213 1162 0


c  2-1 --> 1
c    (-b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧ -p_213) -> (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0)
c  in CNF:
c     b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_2
c     b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_1
c     b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨  b^{1, 214}_0
c  in DIMACS:
 1799 -1800  1801  213 -1802 0
 1799 -1800  1801  213 -1803 0
 1799 -1800  1801  213  1804 0

c  1-1 --> 0
c    (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0 ∧ -p_213) -> (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧ -b^{1, 214}_0)
c  in CNF:
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_2
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_1
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_0
c  in DIMACS:
 1799  1800 -1801  213 -1802 0
 1799  1800 -1801  213 -1803 0
 1799  1800 -1801  213 -1804 0

c  0-1 --> -1
c    (-b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧ -p_213) -> ( b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0)
c  in CNF:
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨  b^{1, 214}_2
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_1
c     b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨  b^{1, 214}_0
c  in DIMACS:
 1799  1800  1801  213  1802 0
 1799  1800  1801  213 -1803 0
 1799  1800  1801  213  1804 0

c  -1-1 --> -2
c    ( b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧  b^{1, 213}_0 ∧ -p_213) -> ( b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0)
c  in CNF:
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨  b^{1, 214}_2
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨  b^{1, 214}_1
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨  p_213 ∨ -b^{1, 214}_0
c  in DIMACS:
-1799  1800 -1801  213  1802 0
-1799  1800 -1801  213  1803 0
-1799  1800 -1801  213 -1804 0

c  -2-1 --> break 
c    ( b^{1, 213}_2 ∧  b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧ -p_213) -> break
c  in CNF:
c    -b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨  b^{1, 213}_0 ∨  p_213 ∨ break
c  in DIMACS:
-1799 -1800  1801  213 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 213}_2 ∧ -b^{1, 213}_1 ∧ -b^{1, 213}_0 ∧ true) 
c  in CNF:
c    -b^{1, 213}_2 ∨  b^{1, 213}_1 ∨  b^{1, 213}_0 ∨ false 
c  in DIMACS:
-1799  1800  1801  0

c  3 does not represent an automaton state.
c    -(-b^{1, 213}_2 ∧  b^{1, 213}_1 ∧  b^{1, 213}_0 ∧ true) 
c  in CNF:
c     b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ false 
c  in DIMACS:
 1799 -1800 -1801  0
c  -3 does not represent an automaton state.
c    -( b^{1, 213}_2 ∧  b^{1, 213}_1 ∧  b^{1, 213}_0 ∧ true) 
c  in CNF:
c    -b^{1, 213}_2 ∨ -b^{1, 213}_1 ∨ -b^{1, 213}_0 ∨ false 
c  in DIMACS:
-1799 -1800 -1801  0

c i = 214
c  -2+1 --> -1
c    ( b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧  p_214) -> ( b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0)
c  in CNF:
c    -b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨  b^{1, 215}_2
c    -b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_1
c    -b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨  b^{1, 215}_0
c  in DIMACS:
-1802 -1803  1804 -214  1805 0
-1802 -1803  1804 -214 -1806 0
-1802 -1803  1804 -214  1807 0

c  -1+1 --> 0
c    ( b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0 ∧  p_214) -> (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧ -b^{1, 215}_0)
c  in CNF:
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_2
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_1
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_0
c  in DIMACS:
-1802  1803 -1804 -214 -1805 0
-1802  1803 -1804 -214 -1806 0
-1802  1803 -1804 -214 -1807 0

c  0+1 --> 1
c    (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧  p_214) -> (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0)
c  in CNF:
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_2
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_1
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨  b^{1, 215}_0
c  in DIMACS:
 1802  1803  1804 -214 -1805 0
 1802  1803  1804 -214 -1806 0
 1802  1803  1804 -214  1807 0

c  1+1 --> 2
c    (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0 ∧  p_214) -> (-b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0)
c  in CNF:
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_2
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨  b^{1, 215}_1
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ -p_214 ∨ -b^{1, 215}_0
c  in DIMACS:
 1802  1803 -1804 -214 -1805 0
 1802  1803 -1804 -214  1806 0
 1802  1803 -1804 -214 -1807 0

c  2+1 --> break 
c    (-b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧  p_214) -> break
c  in CNF:
c     b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ -p_214 ∨ break
c  in DIMACS:
 1802 -1803  1804 -214 1162 0


c  2-1 --> 1
c    (-b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧ -p_214) -> (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0)
c  in CNF:
c     b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_2
c     b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_1
c     b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨  b^{1, 215}_0
c  in DIMACS:
 1802 -1803  1804  214 -1805 0
 1802 -1803  1804  214 -1806 0
 1802 -1803  1804  214  1807 0

c  1-1 --> 0
c    (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0 ∧ -p_214) -> (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧ -b^{1, 215}_0)
c  in CNF:
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_2
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_1
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_0
c  in DIMACS:
 1802  1803 -1804  214 -1805 0
 1802  1803 -1804  214 -1806 0
 1802  1803 -1804  214 -1807 0

c  0-1 --> -1
c    (-b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧ -p_214) -> ( b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0)
c  in CNF:
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨  b^{1, 215}_2
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_1
c     b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨  b^{1, 215}_0
c  in DIMACS:
 1802  1803  1804  214  1805 0
 1802  1803  1804  214 -1806 0
 1802  1803  1804  214  1807 0

c  -1-1 --> -2
c    ( b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧  b^{1, 214}_0 ∧ -p_214) -> ( b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0)
c  in CNF:
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨  b^{1, 215}_2
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨  b^{1, 215}_1
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨  p_214 ∨ -b^{1, 215}_0
c  in DIMACS:
-1802  1803 -1804  214  1805 0
-1802  1803 -1804  214  1806 0
-1802  1803 -1804  214 -1807 0

c  -2-1 --> break 
c    ( b^{1, 214}_2 ∧  b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧ -p_214) -> break
c  in CNF:
c    -b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨  b^{1, 214}_0 ∨  p_214 ∨ break
c  in DIMACS:
-1802 -1803  1804  214 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 214}_2 ∧ -b^{1, 214}_1 ∧ -b^{1, 214}_0 ∧ true) 
c  in CNF:
c    -b^{1, 214}_2 ∨  b^{1, 214}_1 ∨  b^{1, 214}_0 ∨ false 
c  in DIMACS:
-1802  1803  1804  0

c  3 does not represent an automaton state.
c    -(-b^{1, 214}_2 ∧  b^{1, 214}_1 ∧  b^{1, 214}_0 ∧ true) 
c  in CNF:
c     b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ false 
c  in DIMACS:
 1802 -1803 -1804  0
c  -3 does not represent an automaton state.
c    -( b^{1, 214}_2 ∧  b^{1, 214}_1 ∧  b^{1, 214}_0 ∧ true) 
c  in CNF:
c    -b^{1, 214}_2 ∨ -b^{1, 214}_1 ∨ -b^{1, 214}_0 ∨ false 
c  in DIMACS:
-1802 -1803 -1804  0

c i = 215
c  -2+1 --> -1
c    ( b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧  p_215) -> ( b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0)
c  in CNF:
c    -b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨  b^{1, 216}_2
c    -b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_1
c    -b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨  b^{1, 216}_0
c  in DIMACS:
-1805 -1806  1807 -215  1808 0
-1805 -1806  1807 -215 -1809 0
-1805 -1806  1807 -215  1810 0

c  -1+1 --> 0
c    ( b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0 ∧  p_215) -> (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧ -b^{1, 216}_0)
c  in CNF:
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_2
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_1
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_0
c  in DIMACS:
-1805  1806 -1807 -215 -1808 0
-1805  1806 -1807 -215 -1809 0
-1805  1806 -1807 -215 -1810 0

c  0+1 --> 1
c    (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧  p_215) -> (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0)
c  in CNF:
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_2
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_1
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨  b^{1, 216}_0
c  in DIMACS:
 1805  1806  1807 -215 -1808 0
 1805  1806  1807 -215 -1809 0
 1805  1806  1807 -215  1810 0

c  1+1 --> 2
c    (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0 ∧  p_215) -> (-b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0)
c  in CNF:
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_2
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨  b^{1, 216}_1
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ -p_215 ∨ -b^{1, 216}_0
c  in DIMACS:
 1805  1806 -1807 -215 -1808 0
 1805  1806 -1807 -215  1809 0
 1805  1806 -1807 -215 -1810 0

c  2+1 --> break 
c    (-b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧  p_215) -> break
c  in CNF:
c     b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ -p_215 ∨ break
c  in DIMACS:
 1805 -1806  1807 -215 1162 0


c  2-1 --> 1
c    (-b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧ -p_215) -> (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0)
c  in CNF:
c     b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_2
c     b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_1
c     b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨  b^{1, 216}_0
c  in DIMACS:
 1805 -1806  1807  215 -1808 0
 1805 -1806  1807  215 -1809 0
 1805 -1806  1807  215  1810 0

c  1-1 --> 0
c    (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0 ∧ -p_215) -> (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧ -b^{1, 216}_0)
c  in CNF:
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_2
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_1
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_0
c  in DIMACS:
 1805  1806 -1807  215 -1808 0
 1805  1806 -1807  215 -1809 0
 1805  1806 -1807  215 -1810 0

c  0-1 --> -1
c    (-b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧ -p_215) -> ( b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0)
c  in CNF:
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨  b^{1, 216}_2
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_1
c     b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨  b^{1, 216}_0
c  in DIMACS:
 1805  1806  1807  215  1808 0
 1805  1806  1807  215 -1809 0
 1805  1806  1807  215  1810 0

c  -1-1 --> -2
c    ( b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧  b^{1, 215}_0 ∧ -p_215) -> ( b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0)
c  in CNF:
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨  b^{1, 216}_2
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨  b^{1, 216}_1
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨  p_215 ∨ -b^{1, 216}_0
c  in DIMACS:
-1805  1806 -1807  215  1808 0
-1805  1806 -1807  215  1809 0
-1805  1806 -1807  215 -1810 0

c  -2-1 --> break 
c    ( b^{1, 215}_2 ∧  b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧ -p_215) -> break
c  in CNF:
c    -b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨  b^{1, 215}_0 ∨  p_215 ∨ break
c  in DIMACS:
-1805 -1806  1807  215 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 215}_2 ∧ -b^{1, 215}_1 ∧ -b^{1, 215}_0 ∧ true) 
c  in CNF:
c    -b^{1, 215}_2 ∨  b^{1, 215}_1 ∨  b^{1, 215}_0 ∨ false 
c  in DIMACS:
-1805  1806  1807  0

c  3 does not represent an automaton state.
c    -(-b^{1, 215}_2 ∧  b^{1, 215}_1 ∧  b^{1, 215}_0 ∧ true) 
c  in CNF:
c     b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ false 
c  in DIMACS:
 1805 -1806 -1807  0
c  -3 does not represent an automaton state.
c    -( b^{1, 215}_2 ∧  b^{1, 215}_1 ∧  b^{1, 215}_0 ∧ true) 
c  in CNF:
c    -b^{1, 215}_2 ∨ -b^{1, 215}_1 ∨ -b^{1, 215}_0 ∨ false 
c  in DIMACS:
-1805 -1806 -1807  0

c i = 216
c  -2+1 --> -1
c    ( b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧  p_216) -> ( b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0)
c  in CNF:
c    -b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨  b^{1, 217}_2
c    -b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_1
c    -b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨  b^{1, 217}_0
c  in DIMACS:
-1808 -1809  1810 -216  1811 0
-1808 -1809  1810 -216 -1812 0
-1808 -1809  1810 -216  1813 0

c  -1+1 --> 0
c    ( b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0 ∧  p_216) -> (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧ -b^{1, 217}_0)
c  in CNF:
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_2
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_1
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_0
c  in DIMACS:
-1808  1809 -1810 -216 -1811 0
-1808  1809 -1810 -216 -1812 0
-1808  1809 -1810 -216 -1813 0

c  0+1 --> 1
c    (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧  p_216) -> (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0)
c  in CNF:
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_2
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_1
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨  b^{1, 217}_0
c  in DIMACS:
 1808  1809  1810 -216 -1811 0
 1808  1809  1810 -216 -1812 0
 1808  1809  1810 -216  1813 0

c  1+1 --> 2
c    (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0 ∧  p_216) -> (-b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0)
c  in CNF:
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_2
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨  b^{1, 217}_1
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ -p_216 ∨ -b^{1, 217}_0
c  in DIMACS:
 1808  1809 -1810 -216 -1811 0
 1808  1809 -1810 -216  1812 0
 1808  1809 -1810 -216 -1813 0

c  2+1 --> break 
c    (-b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧  p_216) -> break
c  in CNF:
c     b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 1808 -1809  1810 -216 1162 0


c  2-1 --> 1
c    (-b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧ -p_216) -> (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0)
c  in CNF:
c     b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_2
c     b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_1
c     b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨  b^{1, 217}_0
c  in DIMACS:
 1808 -1809  1810  216 -1811 0
 1808 -1809  1810  216 -1812 0
 1808 -1809  1810  216  1813 0

c  1-1 --> 0
c    (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0 ∧ -p_216) -> (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧ -b^{1, 217}_0)
c  in CNF:
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_2
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_1
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_0
c  in DIMACS:
 1808  1809 -1810  216 -1811 0
 1808  1809 -1810  216 -1812 0
 1808  1809 -1810  216 -1813 0

c  0-1 --> -1
c    (-b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧ -p_216) -> ( b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0)
c  in CNF:
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨  b^{1, 217}_2
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_1
c     b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨  b^{1, 217}_0
c  in DIMACS:
 1808  1809  1810  216  1811 0
 1808  1809  1810  216 -1812 0
 1808  1809  1810  216  1813 0

c  -1-1 --> -2
c    ( b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧  b^{1, 216}_0 ∧ -p_216) -> ( b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0)
c  in CNF:
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨  b^{1, 217}_2
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨  b^{1, 217}_1
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨  p_216 ∨ -b^{1, 217}_0
c  in DIMACS:
-1808  1809 -1810  216  1811 0
-1808  1809 -1810  216  1812 0
-1808  1809 -1810  216 -1813 0

c  -2-1 --> break 
c    ( b^{1, 216}_2 ∧  b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨  b^{1, 216}_0 ∨  p_216 ∨ break
c  in DIMACS:
-1808 -1809  1810  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 216}_2 ∧ -b^{1, 216}_1 ∧ -b^{1, 216}_0 ∧ true) 
c  in CNF:
c    -b^{1, 216}_2 ∨  b^{1, 216}_1 ∨  b^{1, 216}_0 ∨ false 
c  in DIMACS:
-1808  1809  1810  0

c  3 does not represent an automaton state.
c    -(-b^{1, 216}_2 ∧  b^{1, 216}_1 ∧  b^{1, 216}_0 ∧ true) 
c  in CNF:
c     b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ false 
c  in DIMACS:
 1808 -1809 -1810  0
c  -3 does not represent an automaton state.
c    -( b^{1, 216}_2 ∧  b^{1, 216}_1 ∧  b^{1, 216}_0 ∧ true) 
c  in CNF:
c    -b^{1, 216}_2 ∨ -b^{1, 216}_1 ∨ -b^{1, 216}_0 ∨ false 
c  in DIMACS:
-1808 -1809 -1810  0

c i = 217
c  -2+1 --> -1
c    ( b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧  p_217) -> ( b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0)
c  in CNF:
c    -b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨  b^{1, 218}_2
c    -b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_1
c    -b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨  b^{1, 218}_0
c  in DIMACS:
-1811 -1812  1813 -217  1814 0
-1811 -1812  1813 -217 -1815 0
-1811 -1812  1813 -217  1816 0

c  -1+1 --> 0
c    ( b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0 ∧  p_217) -> (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧ -b^{1, 218}_0)
c  in CNF:
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_2
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_1
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_0
c  in DIMACS:
-1811  1812 -1813 -217 -1814 0
-1811  1812 -1813 -217 -1815 0
-1811  1812 -1813 -217 -1816 0

c  0+1 --> 1
c    (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧  p_217) -> (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0)
c  in CNF:
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_2
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_1
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨  b^{1, 218}_0
c  in DIMACS:
 1811  1812  1813 -217 -1814 0
 1811  1812  1813 -217 -1815 0
 1811  1812  1813 -217  1816 0

c  1+1 --> 2
c    (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0 ∧  p_217) -> (-b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0)
c  in CNF:
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_2
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨  b^{1, 218}_1
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ -p_217 ∨ -b^{1, 218}_0
c  in DIMACS:
 1811  1812 -1813 -217 -1814 0
 1811  1812 -1813 -217  1815 0
 1811  1812 -1813 -217 -1816 0

c  2+1 --> break 
c    (-b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧  p_217) -> break
c  in CNF:
c     b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ -p_217 ∨ break
c  in DIMACS:
 1811 -1812  1813 -217 1162 0


c  2-1 --> 1
c    (-b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧ -p_217) -> (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0)
c  in CNF:
c     b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_2
c     b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_1
c     b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨  b^{1, 218}_0
c  in DIMACS:
 1811 -1812  1813  217 -1814 0
 1811 -1812  1813  217 -1815 0
 1811 -1812  1813  217  1816 0

c  1-1 --> 0
c    (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0 ∧ -p_217) -> (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧ -b^{1, 218}_0)
c  in CNF:
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_2
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_1
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_0
c  in DIMACS:
 1811  1812 -1813  217 -1814 0
 1811  1812 -1813  217 -1815 0
 1811  1812 -1813  217 -1816 0

c  0-1 --> -1
c    (-b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧ -p_217) -> ( b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0)
c  in CNF:
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨  b^{1, 218}_2
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_1
c     b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨  b^{1, 218}_0
c  in DIMACS:
 1811  1812  1813  217  1814 0
 1811  1812  1813  217 -1815 0
 1811  1812  1813  217  1816 0

c  -1-1 --> -2
c    ( b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧  b^{1, 217}_0 ∧ -p_217) -> ( b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0)
c  in CNF:
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨  b^{1, 218}_2
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨  b^{1, 218}_1
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨  p_217 ∨ -b^{1, 218}_0
c  in DIMACS:
-1811  1812 -1813  217  1814 0
-1811  1812 -1813  217  1815 0
-1811  1812 -1813  217 -1816 0

c  -2-1 --> break 
c    ( b^{1, 217}_2 ∧  b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧ -p_217) -> break
c  in CNF:
c    -b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨  b^{1, 217}_0 ∨  p_217 ∨ break
c  in DIMACS:
-1811 -1812  1813  217 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 217}_2 ∧ -b^{1, 217}_1 ∧ -b^{1, 217}_0 ∧ true) 
c  in CNF:
c    -b^{1, 217}_2 ∨  b^{1, 217}_1 ∨  b^{1, 217}_0 ∨ false 
c  in DIMACS:
-1811  1812  1813  0

c  3 does not represent an automaton state.
c    -(-b^{1, 217}_2 ∧  b^{1, 217}_1 ∧  b^{1, 217}_0 ∧ true) 
c  in CNF:
c     b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ false 
c  in DIMACS:
 1811 -1812 -1813  0
c  -3 does not represent an automaton state.
c    -( b^{1, 217}_2 ∧  b^{1, 217}_1 ∧  b^{1, 217}_0 ∧ true) 
c  in CNF:
c    -b^{1, 217}_2 ∨ -b^{1, 217}_1 ∨ -b^{1, 217}_0 ∨ false 
c  in DIMACS:
-1811 -1812 -1813  0

c i = 218
c  -2+1 --> -1
c    ( b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧  p_218) -> ( b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0)
c  in CNF:
c    -b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨  b^{1, 219}_2
c    -b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_1
c    -b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨  b^{1, 219}_0
c  in DIMACS:
-1814 -1815  1816 -218  1817 0
-1814 -1815  1816 -218 -1818 0
-1814 -1815  1816 -218  1819 0

c  -1+1 --> 0
c    ( b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0 ∧  p_218) -> (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧ -b^{1, 219}_0)
c  in CNF:
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_2
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_1
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_0
c  in DIMACS:
-1814  1815 -1816 -218 -1817 0
-1814  1815 -1816 -218 -1818 0
-1814  1815 -1816 -218 -1819 0

c  0+1 --> 1
c    (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧  p_218) -> (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0)
c  in CNF:
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_2
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_1
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨  b^{1, 219}_0
c  in DIMACS:
 1814  1815  1816 -218 -1817 0
 1814  1815  1816 -218 -1818 0
 1814  1815  1816 -218  1819 0

c  1+1 --> 2
c    (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0 ∧  p_218) -> (-b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0)
c  in CNF:
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_2
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨  b^{1, 219}_1
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ -p_218 ∨ -b^{1, 219}_0
c  in DIMACS:
 1814  1815 -1816 -218 -1817 0
 1814  1815 -1816 -218  1818 0
 1814  1815 -1816 -218 -1819 0

c  2+1 --> break 
c    (-b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧  p_218) -> break
c  in CNF:
c     b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ -p_218 ∨ break
c  in DIMACS:
 1814 -1815  1816 -218 1162 0


c  2-1 --> 1
c    (-b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧ -p_218) -> (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0)
c  in CNF:
c     b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_2
c     b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_1
c     b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨  b^{1, 219}_0
c  in DIMACS:
 1814 -1815  1816  218 -1817 0
 1814 -1815  1816  218 -1818 0
 1814 -1815  1816  218  1819 0

c  1-1 --> 0
c    (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0 ∧ -p_218) -> (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧ -b^{1, 219}_0)
c  in CNF:
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_2
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_1
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_0
c  in DIMACS:
 1814  1815 -1816  218 -1817 0
 1814  1815 -1816  218 -1818 0
 1814  1815 -1816  218 -1819 0

c  0-1 --> -1
c    (-b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧ -p_218) -> ( b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0)
c  in CNF:
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨  b^{1, 219}_2
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_1
c     b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨  b^{1, 219}_0
c  in DIMACS:
 1814  1815  1816  218  1817 0
 1814  1815  1816  218 -1818 0
 1814  1815  1816  218  1819 0

c  -1-1 --> -2
c    ( b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧  b^{1, 218}_0 ∧ -p_218) -> ( b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0)
c  in CNF:
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨  b^{1, 219}_2
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨  b^{1, 219}_1
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨  p_218 ∨ -b^{1, 219}_0
c  in DIMACS:
-1814  1815 -1816  218  1817 0
-1814  1815 -1816  218  1818 0
-1814  1815 -1816  218 -1819 0

c  -2-1 --> break 
c    ( b^{1, 218}_2 ∧  b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧ -p_218) -> break
c  in CNF:
c    -b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨  b^{1, 218}_0 ∨  p_218 ∨ break
c  in DIMACS:
-1814 -1815  1816  218 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 218}_2 ∧ -b^{1, 218}_1 ∧ -b^{1, 218}_0 ∧ true) 
c  in CNF:
c    -b^{1, 218}_2 ∨  b^{1, 218}_1 ∨  b^{1, 218}_0 ∨ false 
c  in DIMACS:
-1814  1815  1816  0

c  3 does not represent an automaton state.
c    -(-b^{1, 218}_2 ∧  b^{1, 218}_1 ∧  b^{1, 218}_0 ∧ true) 
c  in CNF:
c     b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ false 
c  in DIMACS:
 1814 -1815 -1816  0
c  -3 does not represent an automaton state.
c    -( b^{1, 218}_2 ∧  b^{1, 218}_1 ∧  b^{1, 218}_0 ∧ true) 
c  in CNF:
c    -b^{1, 218}_2 ∨ -b^{1, 218}_1 ∨ -b^{1, 218}_0 ∨ false 
c  in DIMACS:
-1814 -1815 -1816  0

c i = 219
c  -2+1 --> -1
c    ( b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧  p_219) -> ( b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0)
c  in CNF:
c    -b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨  b^{1, 220}_2
c    -b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_1
c    -b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨  b^{1, 220}_0
c  in DIMACS:
-1817 -1818  1819 -219  1820 0
-1817 -1818  1819 -219 -1821 0
-1817 -1818  1819 -219  1822 0

c  -1+1 --> 0
c    ( b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0 ∧  p_219) -> (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧ -b^{1, 220}_0)
c  in CNF:
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_2
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_1
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_0
c  in DIMACS:
-1817  1818 -1819 -219 -1820 0
-1817  1818 -1819 -219 -1821 0
-1817  1818 -1819 -219 -1822 0

c  0+1 --> 1
c    (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧  p_219) -> (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0)
c  in CNF:
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_2
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_1
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨  b^{1, 220}_0
c  in DIMACS:
 1817  1818  1819 -219 -1820 0
 1817  1818  1819 -219 -1821 0
 1817  1818  1819 -219  1822 0

c  1+1 --> 2
c    (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0 ∧  p_219) -> (-b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0)
c  in CNF:
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_2
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨  b^{1, 220}_1
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ -p_219 ∨ -b^{1, 220}_0
c  in DIMACS:
 1817  1818 -1819 -219 -1820 0
 1817  1818 -1819 -219  1821 0
 1817  1818 -1819 -219 -1822 0

c  2+1 --> break 
c    (-b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧  p_219) -> break
c  in CNF:
c     b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ -p_219 ∨ break
c  in DIMACS:
 1817 -1818  1819 -219 1162 0


c  2-1 --> 1
c    (-b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧ -p_219) -> (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0)
c  in CNF:
c     b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_2
c     b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_1
c     b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨  b^{1, 220}_0
c  in DIMACS:
 1817 -1818  1819  219 -1820 0
 1817 -1818  1819  219 -1821 0
 1817 -1818  1819  219  1822 0

c  1-1 --> 0
c    (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0 ∧ -p_219) -> (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧ -b^{1, 220}_0)
c  in CNF:
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_2
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_1
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_0
c  in DIMACS:
 1817  1818 -1819  219 -1820 0
 1817  1818 -1819  219 -1821 0
 1817  1818 -1819  219 -1822 0

c  0-1 --> -1
c    (-b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧ -p_219) -> ( b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0)
c  in CNF:
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨  b^{1, 220}_2
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_1
c     b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨  b^{1, 220}_0
c  in DIMACS:
 1817  1818  1819  219  1820 0
 1817  1818  1819  219 -1821 0
 1817  1818  1819  219  1822 0

c  -1-1 --> -2
c    ( b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧  b^{1, 219}_0 ∧ -p_219) -> ( b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0)
c  in CNF:
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨  b^{1, 220}_2
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨  b^{1, 220}_1
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨  p_219 ∨ -b^{1, 220}_0
c  in DIMACS:
-1817  1818 -1819  219  1820 0
-1817  1818 -1819  219  1821 0
-1817  1818 -1819  219 -1822 0

c  -2-1 --> break 
c    ( b^{1, 219}_2 ∧  b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧ -p_219) -> break
c  in CNF:
c    -b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨  b^{1, 219}_0 ∨  p_219 ∨ break
c  in DIMACS:
-1817 -1818  1819  219 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 219}_2 ∧ -b^{1, 219}_1 ∧ -b^{1, 219}_0 ∧ true) 
c  in CNF:
c    -b^{1, 219}_2 ∨  b^{1, 219}_1 ∨  b^{1, 219}_0 ∨ false 
c  in DIMACS:
-1817  1818  1819  0

c  3 does not represent an automaton state.
c    -(-b^{1, 219}_2 ∧  b^{1, 219}_1 ∧  b^{1, 219}_0 ∧ true) 
c  in CNF:
c     b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ false 
c  in DIMACS:
 1817 -1818 -1819  0
c  -3 does not represent an automaton state.
c    -( b^{1, 219}_2 ∧  b^{1, 219}_1 ∧  b^{1, 219}_0 ∧ true) 
c  in CNF:
c    -b^{1, 219}_2 ∨ -b^{1, 219}_1 ∨ -b^{1, 219}_0 ∨ false 
c  in DIMACS:
-1817 -1818 -1819  0

c i = 220
c  -2+1 --> -1
c    ( b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧  p_220) -> ( b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0)
c  in CNF:
c    -b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨  b^{1, 221}_2
c    -b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_1
c    -b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨  b^{1, 221}_0
c  in DIMACS:
-1820 -1821  1822 -220  1823 0
-1820 -1821  1822 -220 -1824 0
-1820 -1821  1822 -220  1825 0

c  -1+1 --> 0
c    ( b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0 ∧  p_220) -> (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧ -b^{1, 221}_0)
c  in CNF:
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_2
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_1
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_0
c  in DIMACS:
-1820  1821 -1822 -220 -1823 0
-1820  1821 -1822 -220 -1824 0
-1820  1821 -1822 -220 -1825 0

c  0+1 --> 1
c    (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧  p_220) -> (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0)
c  in CNF:
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_2
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_1
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨  b^{1, 221}_0
c  in DIMACS:
 1820  1821  1822 -220 -1823 0
 1820  1821  1822 -220 -1824 0
 1820  1821  1822 -220  1825 0

c  1+1 --> 2
c    (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0 ∧  p_220) -> (-b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0)
c  in CNF:
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_2
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨  b^{1, 221}_1
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ -p_220 ∨ -b^{1, 221}_0
c  in DIMACS:
 1820  1821 -1822 -220 -1823 0
 1820  1821 -1822 -220  1824 0
 1820  1821 -1822 -220 -1825 0

c  2+1 --> break 
c    (-b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧  p_220) -> break
c  in CNF:
c     b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 1820 -1821  1822 -220 1162 0


c  2-1 --> 1
c    (-b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧ -p_220) -> (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0)
c  in CNF:
c     b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_2
c     b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_1
c     b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨  b^{1, 221}_0
c  in DIMACS:
 1820 -1821  1822  220 -1823 0
 1820 -1821  1822  220 -1824 0
 1820 -1821  1822  220  1825 0

c  1-1 --> 0
c    (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0 ∧ -p_220) -> (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧ -b^{1, 221}_0)
c  in CNF:
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_2
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_1
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_0
c  in DIMACS:
 1820  1821 -1822  220 -1823 0
 1820  1821 -1822  220 -1824 0
 1820  1821 -1822  220 -1825 0

c  0-1 --> -1
c    (-b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧ -p_220) -> ( b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0)
c  in CNF:
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨  b^{1, 221}_2
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_1
c     b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨  b^{1, 221}_0
c  in DIMACS:
 1820  1821  1822  220  1823 0
 1820  1821  1822  220 -1824 0
 1820  1821  1822  220  1825 0

c  -1-1 --> -2
c    ( b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧  b^{1, 220}_0 ∧ -p_220) -> ( b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0)
c  in CNF:
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨  b^{1, 221}_2
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨  b^{1, 221}_1
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨  p_220 ∨ -b^{1, 221}_0
c  in DIMACS:
-1820  1821 -1822  220  1823 0
-1820  1821 -1822  220  1824 0
-1820  1821 -1822  220 -1825 0

c  -2-1 --> break 
c    ( b^{1, 220}_2 ∧  b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨  b^{1, 220}_0 ∨  p_220 ∨ break
c  in DIMACS:
-1820 -1821  1822  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 220}_2 ∧ -b^{1, 220}_1 ∧ -b^{1, 220}_0 ∧ true) 
c  in CNF:
c    -b^{1, 220}_2 ∨  b^{1, 220}_1 ∨  b^{1, 220}_0 ∨ false 
c  in DIMACS:
-1820  1821  1822  0

c  3 does not represent an automaton state.
c    -(-b^{1, 220}_2 ∧  b^{1, 220}_1 ∧  b^{1, 220}_0 ∧ true) 
c  in CNF:
c     b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ false 
c  in DIMACS:
 1820 -1821 -1822  0
c  -3 does not represent an automaton state.
c    -( b^{1, 220}_2 ∧  b^{1, 220}_1 ∧  b^{1, 220}_0 ∧ true) 
c  in CNF:
c    -b^{1, 220}_2 ∨ -b^{1, 220}_1 ∨ -b^{1, 220}_0 ∨ false 
c  in DIMACS:
-1820 -1821 -1822  0

c i = 221
c  -2+1 --> -1
c    ( b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧  p_221) -> ( b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0)
c  in CNF:
c    -b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨  b^{1, 222}_2
c    -b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_1
c    -b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨  b^{1, 222}_0
c  in DIMACS:
-1823 -1824  1825 -221  1826 0
-1823 -1824  1825 -221 -1827 0
-1823 -1824  1825 -221  1828 0

c  -1+1 --> 0
c    ( b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0 ∧  p_221) -> (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧ -b^{1, 222}_0)
c  in CNF:
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_2
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_1
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_0
c  in DIMACS:
-1823  1824 -1825 -221 -1826 0
-1823  1824 -1825 -221 -1827 0
-1823  1824 -1825 -221 -1828 0

c  0+1 --> 1
c    (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧  p_221) -> (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0)
c  in CNF:
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_2
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_1
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨  b^{1, 222}_0
c  in DIMACS:
 1823  1824  1825 -221 -1826 0
 1823  1824  1825 -221 -1827 0
 1823  1824  1825 -221  1828 0

c  1+1 --> 2
c    (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0 ∧  p_221) -> (-b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0)
c  in CNF:
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_2
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨  b^{1, 222}_1
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ -p_221 ∨ -b^{1, 222}_0
c  in DIMACS:
 1823  1824 -1825 -221 -1826 0
 1823  1824 -1825 -221  1827 0
 1823  1824 -1825 -221 -1828 0

c  2+1 --> break 
c    (-b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧  p_221) -> break
c  in CNF:
c     b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ -p_221 ∨ break
c  in DIMACS:
 1823 -1824  1825 -221 1162 0


c  2-1 --> 1
c    (-b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧ -p_221) -> (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0)
c  in CNF:
c     b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_2
c     b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_1
c     b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨  b^{1, 222}_0
c  in DIMACS:
 1823 -1824  1825  221 -1826 0
 1823 -1824  1825  221 -1827 0
 1823 -1824  1825  221  1828 0

c  1-1 --> 0
c    (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0 ∧ -p_221) -> (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧ -b^{1, 222}_0)
c  in CNF:
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_2
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_1
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_0
c  in DIMACS:
 1823  1824 -1825  221 -1826 0
 1823  1824 -1825  221 -1827 0
 1823  1824 -1825  221 -1828 0

c  0-1 --> -1
c    (-b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧ -p_221) -> ( b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0)
c  in CNF:
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨  b^{1, 222}_2
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_1
c     b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨  b^{1, 222}_0
c  in DIMACS:
 1823  1824  1825  221  1826 0
 1823  1824  1825  221 -1827 0
 1823  1824  1825  221  1828 0

c  -1-1 --> -2
c    ( b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧  b^{1, 221}_0 ∧ -p_221) -> ( b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0)
c  in CNF:
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨  b^{1, 222}_2
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨  b^{1, 222}_1
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨  p_221 ∨ -b^{1, 222}_0
c  in DIMACS:
-1823  1824 -1825  221  1826 0
-1823  1824 -1825  221  1827 0
-1823  1824 -1825  221 -1828 0

c  -2-1 --> break 
c    ( b^{1, 221}_2 ∧  b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧ -p_221) -> break
c  in CNF:
c    -b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨  b^{1, 221}_0 ∨  p_221 ∨ break
c  in DIMACS:
-1823 -1824  1825  221 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 221}_2 ∧ -b^{1, 221}_1 ∧ -b^{1, 221}_0 ∧ true) 
c  in CNF:
c    -b^{1, 221}_2 ∨  b^{1, 221}_1 ∨  b^{1, 221}_0 ∨ false 
c  in DIMACS:
-1823  1824  1825  0

c  3 does not represent an automaton state.
c    -(-b^{1, 221}_2 ∧  b^{1, 221}_1 ∧  b^{1, 221}_0 ∧ true) 
c  in CNF:
c     b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ false 
c  in DIMACS:
 1823 -1824 -1825  0
c  -3 does not represent an automaton state.
c    -( b^{1, 221}_2 ∧  b^{1, 221}_1 ∧  b^{1, 221}_0 ∧ true) 
c  in CNF:
c    -b^{1, 221}_2 ∨ -b^{1, 221}_1 ∨ -b^{1, 221}_0 ∨ false 
c  in DIMACS:
-1823 -1824 -1825  0

c i = 222
c  -2+1 --> -1
c    ( b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧  p_222) -> ( b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0)
c  in CNF:
c    -b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨  b^{1, 223}_2
c    -b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_1
c    -b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨  b^{1, 223}_0
c  in DIMACS:
-1826 -1827  1828 -222  1829 0
-1826 -1827  1828 -222 -1830 0
-1826 -1827  1828 -222  1831 0

c  -1+1 --> 0
c    ( b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0 ∧  p_222) -> (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧ -b^{1, 223}_0)
c  in CNF:
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_2
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_1
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_0
c  in DIMACS:
-1826  1827 -1828 -222 -1829 0
-1826  1827 -1828 -222 -1830 0
-1826  1827 -1828 -222 -1831 0

c  0+1 --> 1
c    (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧  p_222) -> (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0)
c  in CNF:
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_2
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_1
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨  b^{1, 223}_0
c  in DIMACS:
 1826  1827  1828 -222 -1829 0
 1826  1827  1828 -222 -1830 0
 1826  1827  1828 -222  1831 0

c  1+1 --> 2
c    (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0 ∧  p_222) -> (-b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0)
c  in CNF:
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_2
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨  b^{1, 223}_1
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ -p_222 ∨ -b^{1, 223}_0
c  in DIMACS:
 1826  1827 -1828 -222 -1829 0
 1826  1827 -1828 -222  1830 0
 1826  1827 -1828 -222 -1831 0

c  2+1 --> break 
c    (-b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧  p_222) -> break
c  in CNF:
c     b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 1826 -1827  1828 -222 1162 0


c  2-1 --> 1
c    (-b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧ -p_222) -> (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0)
c  in CNF:
c     b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_2
c     b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_1
c     b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨  b^{1, 223}_0
c  in DIMACS:
 1826 -1827  1828  222 -1829 0
 1826 -1827  1828  222 -1830 0
 1826 -1827  1828  222  1831 0

c  1-1 --> 0
c    (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0 ∧ -p_222) -> (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧ -b^{1, 223}_0)
c  in CNF:
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_2
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_1
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_0
c  in DIMACS:
 1826  1827 -1828  222 -1829 0
 1826  1827 -1828  222 -1830 0
 1826  1827 -1828  222 -1831 0

c  0-1 --> -1
c    (-b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧ -p_222) -> ( b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0)
c  in CNF:
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨  b^{1, 223}_2
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_1
c     b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨  b^{1, 223}_0
c  in DIMACS:
 1826  1827  1828  222  1829 0
 1826  1827  1828  222 -1830 0
 1826  1827  1828  222  1831 0

c  -1-1 --> -2
c    ( b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧  b^{1, 222}_0 ∧ -p_222) -> ( b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0)
c  in CNF:
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨  b^{1, 223}_2
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨  b^{1, 223}_1
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨  p_222 ∨ -b^{1, 223}_0
c  in DIMACS:
-1826  1827 -1828  222  1829 0
-1826  1827 -1828  222  1830 0
-1826  1827 -1828  222 -1831 0

c  -2-1 --> break 
c    ( b^{1, 222}_2 ∧  b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨  b^{1, 222}_0 ∨  p_222 ∨ break
c  in DIMACS:
-1826 -1827  1828  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 222}_2 ∧ -b^{1, 222}_1 ∧ -b^{1, 222}_0 ∧ true) 
c  in CNF:
c    -b^{1, 222}_2 ∨  b^{1, 222}_1 ∨  b^{1, 222}_0 ∨ false 
c  in DIMACS:
-1826  1827  1828  0

c  3 does not represent an automaton state.
c    -(-b^{1, 222}_2 ∧  b^{1, 222}_1 ∧  b^{1, 222}_0 ∧ true) 
c  in CNF:
c     b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ false 
c  in DIMACS:
 1826 -1827 -1828  0
c  -3 does not represent an automaton state.
c    -( b^{1, 222}_2 ∧  b^{1, 222}_1 ∧  b^{1, 222}_0 ∧ true) 
c  in CNF:
c    -b^{1, 222}_2 ∨ -b^{1, 222}_1 ∨ -b^{1, 222}_0 ∨ false 
c  in DIMACS:
-1826 -1827 -1828  0

c i = 223
c  -2+1 --> -1
c    ( b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧  p_223) -> ( b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0)
c  in CNF:
c    -b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨  b^{1, 224}_2
c    -b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_1
c    -b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨  b^{1, 224}_0
c  in DIMACS:
-1829 -1830  1831 -223  1832 0
-1829 -1830  1831 -223 -1833 0
-1829 -1830  1831 -223  1834 0

c  -1+1 --> 0
c    ( b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0 ∧  p_223) -> (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧ -b^{1, 224}_0)
c  in CNF:
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_2
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_1
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_0
c  in DIMACS:
-1829  1830 -1831 -223 -1832 0
-1829  1830 -1831 -223 -1833 0
-1829  1830 -1831 -223 -1834 0

c  0+1 --> 1
c    (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧  p_223) -> (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0)
c  in CNF:
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_2
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_1
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨  b^{1, 224}_0
c  in DIMACS:
 1829  1830  1831 -223 -1832 0
 1829  1830  1831 -223 -1833 0
 1829  1830  1831 -223  1834 0

c  1+1 --> 2
c    (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0 ∧  p_223) -> (-b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0)
c  in CNF:
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_2
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨  b^{1, 224}_1
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ -p_223 ∨ -b^{1, 224}_0
c  in DIMACS:
 1829  1830 -1831 -223 -1832 0
 1829  1830 -1831 -223  1833 0
 1829  1830 -1831 -223 -1834 0

c  2+1 --> break 
c    (-b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧  p_223) -> break
c  in CNF:
c     b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ -p_223 ∨ break
c  in DIMACS:
 1829 -1830  1831 -223 1162 0


c  2-1 --> 1
c    (-b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧ -p_223) -> (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0)
c  in CNF:
c     b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_2
c     b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_1
c     b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨  b^{1, 224}_0
c  in DIMACS:
 1829 -1830  1831  223 -1832 0
 1829 -1830  1831  223 -1833 0
 1829 -1830  1831  223  1834 0

c  1-1 --> 0
c    (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0 ∧ -p_223) -> (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧ -b^{1, 224}_0)
c  in CNF:
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_2
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_1
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_0
c  in DIMACS:
 1829  1830 -1831  223 -1832 0
 1829  1830 -1831  223 -1833 0
 1829  1830 -1831  223 -1834 0

c  0-1 --> -1
c    (-b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧ -p_223) -> ( b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0)
c  in CNF:
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨  b^{1, 224}_2
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_1
c     b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨  b^{1, 224}_0
c  in DIMACS:
 1829  1830  1831  223  1832 0
 1829  1830  1831  223 -1833 0
 1829  1830  1831  223  1834 0

c  -1-1 --> -2
c    ( b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧  b^{1, 223}_0 ∧ -p_223) -> ( b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0)
c  in CNF:
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨  b^{1, 224}_2
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨  b^{1, 224}_1
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨  p_223 ∨ -b^{1, 224}_0
c  in DIMACS:
-1829  1830 -1831  223  1832 0
-1829  1830 -1831  223  1833 0
-1829  1830 -1831  223 -1834 0

c  -2-1 --> break 
c    ( b^{1, 223}_2 ∧  b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧ -p_223) -> break
c  in CNF:
c    -b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨  b^{1, 223}_0 ∨  p_223 ∨ break
c  in DIMACS:
-1829 -1830  1831  223 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 223}_2 ∧ -b^{1, 223}_1 ∧ -b^{1, 223}_0 ∧ true) 
c  in CNF:
c    -b^{1, 223}_2 ∨  b^{1, 223}_1 ∨  b^{1, 223}_0 ∨ false 
c  in DIMACS:
-1829  1830  1831  0

c  3 does not represent an automaton state.
c    -(-b^{1, 223}_2 ∧  b^{1, 223}_1 ∧  b^{1, 223}_0 ∧ true) 
c  in CNF:
c     b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ false 
c  in DIMACS:
 1829 -1830 -1831  0
c  -3 does not represent an automaton state.
c    -( b^{1, 223}_2 ∧  b^{1, 223}_1 ∧  b^{1, 223}_0 ∧ true) 
c  in CNF:
c    -b^{1, 223}_2 ∨ -b^{1, 223}_1 ∨ -b^{1, 223}_0 ∨ false 
c  in DIMACS:
-1829 -1830 -1831  0

c i = 224
c  -2+1 --> -1
c    ( b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧  p_224) -> ( b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0)
c  in CNF:
c    -b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨  b^{1, 225}_2
c    -b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_1
c    -b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨  b^{1, 225}_0
c  in DIMACS:
-1832 -1833  1834 -224  1835 0
-1832 -1833  1834 -224 -1836 0
-1832 -1833  1834 -224  1837 0

c  -1+1 --> 0
c    ( b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0 ∧  p_224) -> (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧ -b^{1, 225}_0)
c  in CNF:
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_2
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_1
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_0
c  in DIMACS:
-1832  1833 -1834 -224 -1835 0
-1832  1833 -1834 -224 -1836 0
-1832  1833 -1834 -224 -1837 0

c  0+1 --> 1
c    (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧  p_224) -> (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0)
c  in CNF:
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_2
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_1
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨  b^{1, 225}_0
c  in DIMACS:
 1832  1833  1834 -224 -1835 0
 1832  1833  1834 -224 -1836 0
 1832  1833  1834 -224  1837 0

c  1+1 --> 2
c    (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0 ∧  p_224) -> (-b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0)
c  in CNF:
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_2
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨  b^{1, 225}_1
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ -p_224 ∨ -b^{1, 225}_0
c  in DIMACS:
 1832  1833 -1834 -224 -1835 0
 1832  1833 -1834 -224  1836 0
 1832  1833 -1834 -224 -1837 0

c  2+1 --> break 
c    (-b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧  p_224) -> break
c  in CNF:
c     b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 1832 -1833  1834 -224 1162 0


c  2-1 --> 1
c    (-b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧ -p_224) -> (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0)
c  in CNF:
c     b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_2
c     b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_1
c     b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨  b^{1, 225}_0
c  in DIMACS:
 1832 -1833  1834  224 -1835 0
 1832 -1833  1834  224 -1836 0
 1832 -1833  1834  224  1837 0

c  1-1 --> 0
c    (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0 ∧ -p_224) -> (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧ -b^{1, 225}_0)
c  in CNF:
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_2
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_1
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_0
c  in DIMACS:
 1832  1833 -1834  224 -1835 0
 1832  1833 -1834  224 -1836 0
 1832  1833 -1834  224 -1837 0

c  0-1 --> -1
c    (-b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧ -p_224) -> ( b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0)
c  in CNF:
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨  b^{1, 225}_2
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_1
c     b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨  b^{1, 225}_0
c  in DIMACS:
 1832  1833  1834  224  1835 0
 1832  1833  1834  224 -1836 0
 1832  1833  1834  224  1837 0

c  -1-1 --> -2
c    ( b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧  b^{1, 224}_0 ∧ -p_224) -> ( b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0)
c  in CNF:
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨  b^{1, 225}_2
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨  b^{1, 225}_1
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨  p_224 ∨ -b^{1, 225}_0
c  in DIMACS:
-1832  1833 -1834  224  1835 0
-1832  1833 -1834  224  1836 0
-1832  1833 -1834  224 -1837 0

c  -2-1 --> break 
c    ( b^{1, 224}_2 ∧  b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨  b^{1, 224}_0 ∨  p_224 ∨ break
c  in DIMACS:
-1832 -1833  1834  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 224}_2 ∧ -b^{1, 224}_1 ∧ -b^{1, 224}_0 ∧ true) 
c  in CNF:
c    -b^{1, 224}_2 ∨  b^{1, 224}_1 ∨  b^{1, 224}_0 ∨ false 
c  in DIMACS:
-1832  1833  1834  0

c  3 does not represent an automaton state.
c    -(-b^{1, 224}_2 ∧  b^{1, 224}_1 ∧  b^{1, 224}_0 ∧ true) 
c  in CNF:
c     b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ false 
c  in DIMACS:
 1832 -1833 -1834  0
c  -3 does not represent an automaton state.
c    -( b^{1, 224}_2 ∧  b^{1, 224}_1 ∧  b^{1, 224}_0 ∧ true) 
c  in CNF:
c    -b^{1, 224}_2 ∨ -b^{1, 224}_1 ∨ -b^{1, 224}_0 ∨ false 
c  in DIMACS:
-1832 -1833 -1834  0

c i = 225
c  -2+1 --> -1
c    ( b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧  p_225) -> ( b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0)
c  in CNF:
c    -b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨  b^{1, 226}_2
c    -b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_1
c    -b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨  b^{1, 226}_0
c  in DIMACS:
-1835 -1836  1837 -225  1838 0
-1835 -1836  1837 -225 -1839 0
-1835 -1836  1837 -225  1840 0

c  -1+1 --> 0
c    ( b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0 ∧  p_225) -> (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧ -b^{1, 226}_0)
c  in CNF:
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_2
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_1
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_0
c  in DIMACS:
-1835  1836 -1837 -225 -1838 0
-1835  1836 -1837 -225 -1839 0
-1835  1836 -1837 -225 -1840 0

c  0+1 --> 1
c    (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧  p_225) -> (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0)
c  in CNF:
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_2
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_1
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨  b^{1, 226}_0
c  in DIMACS:
 1835  1836  1837 -225 -1838 0
 1835  1836  1837 -225 -1839 0
 1835  1836  1837 -225  1840 0

c  1+1 --> 2
c    (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0 ∧  p_225) -> (-b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0)
c  in CNF:
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_2
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨  b^{1, 226}_1
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ -p_225 ∨ -b^{1, 226}_0
c  in DIMACS:
 1835  1836 -1837 -225 -1838 0
 1835  1836 -1837 -225  1839 0
 1835  1836 -1837 -225 -1840 0

c  2+1 --> break 
c    (-b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧  p_225) -> break
c  in CNF:
c     b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 1835 -1836  1837 -225 1162 0


c  2-1 --> 1
c    (-b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧ -p_225) -> (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0)
c  in CNF:
c     b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_2
c     b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_1
c     b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨  b^{1, 226}_0
c  in DIMACS:
 1835 -1836  1837  225 -1838 0
 1835 -1836  1837  225 -1839 0
 1835 -1836  1837  225  1840 0

c  1-1 --> 0
c    (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0 ∧ -p_225) -> (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧ -b^{1, 226}_0)
c  in CNF:
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_2
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_1
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_0
c  in DIMACS:
 1835  1836 -1837  225 -1838 0
 1835  1836 -1837  225 -1839 0
 1835  1836 -1837  225 -1840 0

c  0-1 --> -1
c    (-b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧ -p_225) -> ( b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0)
c  in CNF:
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨  b^{1, 226}_2
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_1
c     b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨  b^{1, 226}_0
c  in DIMACS:
 1835  1836  1837  225  1838 0
 1835  1836  1837  225 -1839 0
 1835  1836  1837  225  1840 0

c  -1-1 --> -2
c    ( b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧  b^{1, 225}_0 ∧ -p_225) -> ( b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0)
c  in CNF:
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨  b^{1, 226}_2
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨  b^{1, 226}_1
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨  p_225 ∨ -b^{1, 226}_0
c  in DIMACS:
-1835  1836 -1837  225  1838 0
-1835  1836 -1837  225  1839 0
-1835  1836 -1837  225 -1840 0

c  -2-1 --> break 
c    ( b^{1, 225}_2 ∧  b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨  b^{1, 225}_0 ∨  p_225 ∨ break
c  in DIMACS:
-1835 -1836  1837  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 225}_2 ∧ -b^{1, 225}_1 ∧ -b^{1, 225}_0 ∧ true) 
c  in CNF:
c    -b^{1, 225}_2 ∨  b^{1, 225}_1 ∨  b^{1, 225}_0 ∨ false 
c  in DIMACS:
-1835  1836  1837  0

c  3 does not represent an automaton state.
c    -(-b^{1, 225}_2 ∧  b^{1, 225}_1 ∧  b^{1, 225}_0 ∧ true) 
c  in CNF:
c     b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ false 
c  in DIMACS:
 1835 -1836 -1837  0
c  -3 does not represent an automaton state.
c    -( b^{1, 225}_2 ∧  b^{1, 225}_1 ∧  b^{1, 225}_0 ∧ true) 
c  in CNF:
c    -b^{1, 225}_2 ∨ -b^{1, 225}_1 ∨ -b^{1, 225}_0 ∨ false 
c  in DIMACS:
-1835 -1836 -1837  0

c i = 226
c  -2+1 --> -1
c    ( b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧  p_226) -> ( b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0)
c  in CNF:
c    -b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨  b^{1, 227}_2
c    -b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_1
c    -b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨  b^{1, 227}_0
c  in DIMACS:
-1838 -1839  1840 -226  1841 0
-1838 -1839  1840 -226 -1842 0
-1838 -1839  1840 -226  1843 0

c  -1+1 --> 0
c    ( b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0 ∧  p_226) -> (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧ -b^{1, 227}_0)
c  in CNF:
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_2
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_1
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_0
c  in DIMACS:
-1838  1839 -1840 -226 -1841 0
-1838  1839 -1840 -226 -1842 0
-1838  1839 -1840 -226 -1843 0

c  0+1 --> 1
c    (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧  p_226) -> (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0)
c  in CNF:
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_2
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_1
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨  b^{1, 227}_0
c  in DIMACS:
 1838  1839  1840 -226 -1841 0
 1838  1839  1840 -226 -1842 0
 1838  1839  1840 -226  1843 0

c  1+1 --> 2
c    (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0 ∧  p_226) -> (-b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0)
c  in CNF:
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_2
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨  b^{1, 227}_1
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ -p_226 ∨ -b^{1, 227}_0
c  in DIMACS:
 1838  1839 -1840 -226 -1841 0
 1838  1839 -1840 -226  1842 0
 1838  1839 -1840 -226 -1843 0

c  2+1 --> break 
c    (-b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧  p_226) -> break
c  in CNF:
c     b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ -p_226 ∨ break
c  in DIMACS:
 1838 -1839  1840 -226 1162 0


c  2-1 --> 1
c    (-b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧ -p_226) -> (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0)
c  in CNF:
c     b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_2
c     b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_1
c     b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨  b^{1, 227}_0
c  in DIMACS:
 1838 -1839  1840  226 -1841 0
 1838 -1839  1840  226 -1842 0
 1838 -1839  1840  226  1843 0

c  1-1 --> 0
c    (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0 ∧ -p_226) -> (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧ -b^{1, 227}_0)
c  in CNF:
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_2
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_1
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_0
c  in DIMACS:
 1838  1839 -1840  226 -1841 0
 1838  1839 -1840  226 -1842 0
 1838  1839 -1840  226 -1843 0

c  0-1 --> -1
c    (-b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧ -p_226) -> ( b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0)
c  in CNF:
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨  b^{1, 227}_2
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_1
c     b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨  b^{1, 227}_0
c  in DIMACS:
 1838  1839  1840  226  1841 0
 1838  1839  1840  226 -1842 0
 1838  1839  1840  226  1843 0

c  -1-1 --> -2
c    ( b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧  b^{1, 226}_0 ∧ -p_226) -> ( b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0)
c  in CNF:
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨  b^{1, 227}_2
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨  b^{1, 227}_1
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨  p_226 ∨ -b^{1, 227}_0
c  in DIMACS:
-1838  1839 -1840  226  1841 0
-1838  1839 -1840  226  1842 0
-1838  1839 -1840  226 -1843 0

c  -2-1 --> break 
c    ( b^{1, 226}_2 ∧  b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧ -p_226) -> break
c  in CNF:
c    -b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨  b^{1, 226}_0 ∨  p_226 ∨ break
c  in DIMACS:
-1838 -1839  1840  226 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 226}_2 ∧ -b^{1, 226}_1 ∧ -b^{1, 226}_0 ∧ true) 
c  in CNF:
c    -b^{1, 226}_2 ∨  b^{1, 226}_1 ∨  b^{1, 226}_0 ∨ false 
c  in DIMACS:
-1838  1839  1840  0

c  3 does not represent an automaton state.
c    -(-b^{1, 226}_2 ∧  b^{1, 226}_1 ∧  b^{1, 226}_0 ∧ true) 
c  in CNF:
c     b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ false 
c  in DIMACS:
 1838 -1839 -1840  0
c  -3 does not represent an automaton state.
c    -( b^{1, 226}_2 ∧  b^{1, 226}_1 ∧  b^{1, 226}_0 ∧ true) 
c  in CNF:
c    -b^{1, 226}_2 ∨ -b^{1, 226}_1 ∨ -b^{1, 226}_0 ∨ false 
c  in DIMACS:
-1838 -1839 -1840  0

c i = 227
c  -2+1 --> -1
c    ( b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧  p_227) -> ( b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0)
c  in CNF:
c    -b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨  b^{1, 228}_2
c    -b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_1
c    -b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨  b^{1, 228}_0
c  in DIMACS:
-1841 -1842  1843 -227  1844 0
-1841 -1842  1843 -227 -1845 0
-1841 -1842  1843 -227  1846 0

c  -1+1 --> 0
c    ( b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0 ∧  p_227) -> (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧ -b^{1, 228}_0)
c  in CNF:
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_2
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_1
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_0
c  in DIMACS:
-1841  1842 -1843 -227 -1844 0
-1841  1842 -1843 -227 -1845 0
-1841  1842 -1843 -227 -1846 0

c  0+1 --> 1
c    (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧  p_227) -> (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0)
c  in CNF:
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_2
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_1
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨  b^{1, 228}_0
c  in DIMACS:
 1841  1842  1843 -227 -1844 0
 1841  1842  1843 -227 -1845 0
 1841  1842  1843 -227  1846 0

c  1+1 --> 2
c    (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0 ∧  p_227) -> (-b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0)
c  in CNF:
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_2
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨  b^{1, 228}_1
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ -p_227 ∨ -b^{1, 228}_0
c  in DIMACS:
 1841  1842 -1843 -227 -1844 0
 1841  1842 -1843 -227  1845 0
 1841  1842 -1843 -227 -1846 0

c  2+1 --> break 
c    (-b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧  p_227) -> break
c  in CNF:
c     b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ -p_227 ∨ break
c  in DIMACS:
 1841 -1842  1843 -227 1162 0


c  2-1 --> 1
c    (-b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧ -p_227) -> (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0)
c  in CNF:
c     b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_2
c     b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_1
c     b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨  b^{1, 228}_0
c  in DIMACS:
 1841 -1842  1843  227 -1844 0
 1841 -1842  1843  227 -1845 0
 1841 -1842  1843  227  1846 0

c  1-1 --> 0
c    (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0 ∧ -p_227) -> (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧ -b^{1, 228}_0)
c  in CNF:
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_2
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_1
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_0
c  in DIMACS:
 1841  1842 -1843  227 -1844 0
 1841  1842 -1843  227 -1845 0
 1841  1842 -1843  227 -1846 0

c  0-1 --> -1
c    (-b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧ -p_227) -> ( b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0)
c  in CNF:
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨  b^{1, 228}_2
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_1
c     b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨  b^{1, 228}_0
c  in DIMACS:
 1841  1842  1843  227  1844 0
 1841  1842  1843  227 -1845 0
 1841  1842  1843  227  1846 0

c  -1-1 --> -2
c    ( b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧  b^{1, 227}_0 ∧ -p_227) -> ( b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0)
c  in CNF:
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨  b^{1, 228}_2
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨  b^{1, 228}_1
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨  p_227 ∨ -b^{1, 228}_0
c  in DIMACS:
-1841  1842 -1843  227  1844 0
-1841  1842 -1843  227  1845 0
-1841  1842 -1843  227 -1846 0

c  -2-1 --> break 
c    ( b^{1, 227}_2 ∧  b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧ -p_227) -> break
c  in CNF:
c    -b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨  b^{1, 227}_0 ∨  p_227 ∨ break
c  in DIMACS:
-1841 -1842  1843  227 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 227}_2 ∧ -b^{1, 227}_1 ∧ -b^{1, 227}_0 ∧ true) 
c  in CNF:
c    -b^{1, 227}_2 ∨  b^{1, 227}_1 ∨  b^{1, 227}_0 ∨ false 
c  in DIMACS:
-1841  1842  1843  0

c  3 does not represent an automaton state.
c    -(-b^{1, 227}_2 ∧  b^{1, 227}_1 ∧  b^{1, 227}_0 ∧ true) 
c  in CNF:
c     b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ false 
c  in DIMACS:
 1841 -1842 -1843  0
c  -3 does not represent an automaton state.
c    -( b^{1, 227}_2 ∧  b^{1, 227}_1 ∧  b^{1, 227}_0 ∧ true) 
c  in CNF:
c    -b^{1, 227}_2 ∨ -b^{1, 227}_1 ∨ -b^{1, 227}_0 ∨ false 
c  in DIMACS:
-1841 -1842 -1843  0

c i = 228
c  -2+1 --> -1
c    ( b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧  p_228) -> ( b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0)
c  in CNF:
c    -b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨  b^{1, 229}_2
c    -b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_1
c    -b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨  b^{1, 229}_0
c  in DIMACS:
-1844 -1845  1846 -228  1847 0
-1844 -1845  1846 -228 -1848 0
-1844 -1845  1846 -228  1849 0

c  -1+1 --> 0
c    ( b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0 ∧  p_228) -> (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧ -b^{1, 229}_0)
c  in CNF:
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_2
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_1
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_0
c  in DIMACS:
-1844  1845 -1846 -228 -1847 0
-1844  1845 -1846 -228 -1848 0
-1844  1845 -1846 -228 -1849 0

c  0+1 --> 1
c    (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧  p_228) -> (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0)
c  in CNF:
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_2
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_1
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨  b^{1, 229}_0
c  in DIMACS:
 1844  1845  1846 -228 -1847 0
 1844  1845  1846 -228 -1848 0
 1844  1845  1846 -228  1849 0

c  1+1 --> 2
c    (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0 ∧  p_228) -> (-b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0)
c  in CNF:
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_2
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨  b^{1, 229}_1
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ -p_228 ∨ -b^{1, 229}_0
c  in DIMACS:
 1844  1845 -1846 -228 -1847 0
 1844  1845 -1846 -228  1848 0
 1844  1845 -1846 -228 -1849 0

c  2+1 --> break 
c    (-b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧  p_228) -> break
c  in CNF:
c     b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 1844 -1845  1846 -228 1162 0


c  2-1 --> 1
c    (-b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧ -p_228) -> (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0)
c  in CNF:
c     b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_2
c     b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_1
c     b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨  b^{1, 229}_0
c  in DIMACS:
 1844 -1845  1846  228 -1847 0
 1844 -1845  1846  228 -1848 0
 1844 -1845  1846  228  1849 0

c  1-1 --> 0
c    (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0 ∧ -p_228) -> (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧ -b^{1, 229}_0)
c  in CNF:
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_2
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_1
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_0
c  in DIMACS:
 1844  1845 -1846  228 -1847 0
 1844  1845 -1846  228 -1848 0
 1844  1845 -1846  228 -1849 0

c  0-1 --> -1
c    (-b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧ -p_228) -> ( b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0)
c  in CNF:
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨  b^{1, 229}_2
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_1
c     b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨  b^{1, 229}_0
c  in DIMACS:
 1844  1845  1846  228  1847 0
 1844  1845  1846  228 -1848 0
 1844  1845  1846  228  1849 0

c  -1-1 --> -2
c    ( b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧  b^{1, 228}_0 ∧ -p_228) -> ( b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0)
c  in CNF:
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨  b^{1, 229}_2
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨  b^{1, 229}_1
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨  p_228 ∨ -b^{1, 229}_0
c  in DIMACS:
-1844  1845 -1846  228  1847 0
-1844  1845 -1846  228  1848 0
-1844  1845 -1846  228 -1849 0

c  -2-1 --> break 
c    ( b^{1, 228}_2 ∧  b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨  b^{1, 228}_0 ∨  p_228 ∨ break
c  in DIMACS:
-1844 -1845  1846  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 228}_2 ∧ -b^{1, 228}_1 ∧ -b^{1, 228}_0 ∧ true) 
c  in CNF:
c    -b^{1, 228}_2 ∨  b^{1, 228}_1 ∨  b^{1, 228}_0 ∨ false 
c  in DIMACS:
-1844  1845  1846  0

c  3 does not represent an automaton state.
c    -(-b^{1, 228}_2 ∧  b^{1, 228}_1 ∧  b^{1, 228}_0 ∧ true) 
c  in CNF:
c     b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ false 
c  in DIMACS:
 1844 -1845 -1846  0
c  -3 does not represent an automaton state.
c    -( b^{1, 228}_2 ∧  b^{1, 228}_1 ∧  b^{1, 228}_0 ∧ true) 
c  in CNF:
c    -b^{1, 228}_2 ∨ -b^{1, 228}_1 ∨ -b^{1, 228}_0 ∨ false 
c  in DIMACS:
-1844 -1845 -1846  0

c i = 229
c  -2+1 --> -1
c    ( b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧  p_229) -> ( b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0)
c  in CNF:
c    -b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨  b^{1, 230}_2
c    -b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_1
c    -b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨  b^{1, 230}_0
c  in DIMACS:
-1847 -1848  1849 -229  1850 0
-1847 -1848  1849 -229 -1851 0
-1847 -1848  1849 -229  1852 0

c  -1+1 --> 0
c    ( b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0 ∧  p_229) -> (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧ -b^{1, 230}_0)
c  in CNF:
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_2
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_1
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_0
c  in DIMACS:
-1847  1848 -1849 -229 -1850 0
-1847  1848 -1849 -229 -1851 0
-1847  1848 -1849 -229 -1852 0

c  0+1 --> 1
c    (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧  p_229) -> (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0)
c  in CNF:
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_2
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_1
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨  b^{1, 230}_0
c  in DIMACS:
 1847  1848  1849 -229 -1850 0
 1847  1848  1849 -229 -1851 0
 1847  1848  1849 -229  1852 0

c  1+1 --> 2
c    (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0 ∧  p_229) -> (-b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0)
c  in CNF:
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_2
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨  b^{1, 230}_1
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ -p_229 ∨ -b^{1, 230}_0
c  in DIMACS:
 1847  1848 -1849 -229 -1850 0
 1847  1848 -1849 -229  1851 0
 1847  1848 -1849 -229 -1852 0

c  2+1 --> break 
c    (-b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧  p_229) -> break
c  in CNF:
c     b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ -p_229 ∨ break
c  in DIMACS:
 1847 -1848  1849 -229 1162 0


c  2-1 --> 1
c    (-b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧ -p_229) -> (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0)
c  in CNF:
c     b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_2
c     b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_1
c     b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨  b^{1, 230}_0
c  in DIMACS:
 1847 -1848  1849  229 -1850 0
 1847 -1848  1849  229 -1851 0
 1847 -1848  1849  229  1852 0

c  1-1 --> 0
c    (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0 ∧ -p_229) -> (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧ -b^{1, 230}_0)
c  in CNF:
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_2
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_1
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_0
c  in DIMACS:
 1847  1848 -1849  229 -1850 0
 1847  1848 -1849  229 -1851 0
 1847  1848 -1849  229 -1852 0

c  0-1 --> -1
c    (-b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧ -p_229) -> ( b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0)
c  in CNF:
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨  b^{1, 230}_2
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_1
c     b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨  b^{1, 230}_0
c  in DIMACS:
 1847  1848  1849  229  1850 0
 1847  1848  1849  229 -1851 0
 1847  1848  1849  229  1852 0

c  -1-1 --> -2
c    ( b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧  b^{1, 229}_0 ∧ -p_229) -> ( b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0)
c  in CNF:
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨  b^{1, 230}_2
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨  b^{1, 230}_1
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨  p_229 ∨ -b^{1, 230}_0
c  in DIMACS:
-1847  1848 -1849  229  1850 0
-1847  1848 -1849  229  1851 0
-1847  1848 -1849  229 -1852 0

c  -2-1 --> break 
c    ( b^{1, 229}_2 ∧  b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧ -p_229) -> break
c  in CNF:
c    -b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨  b^{1, 229}_0 ∨  p_229 ∨ break
c  in DIMACS:
-1847 -1848  1849  229 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 229}_2 ∧ -b^{1, 229}_1 ∧ -b^{1, 229}_0 ∧ true) 
c  in CNF:
c    -b^{1, 229}_2 ∨  b^{1, 229}_1 ∨  b^{1, 229}_0 ∨ false 
c  in DIMACS:
-1847  1848  1849  0

c  3 does not represent an automaton state.
c    -(-b^{1, 229}_2 ∧  b^{1, 229}_1 ∧  b^{1, 229}_0 ∧ true) 
c  in CNF:
c     b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ false 
c  in DIMACS:
 1847 -1848 -1849  0
c  -3 does not represent an automaton state.
c    -( b^{1, 229}_2 ∧  b^{1, 229}_1 ∧  b^{1, 229}_0 ∧ true) 
c  in CNF:
c    -b^{1, 229}_2 ∨ -b^{1, 229}_1 ∨ -b^{1, 229}_0 ∨ false 
c  in DIMACS:
-1847 -1848 -1849  0

c i = 230
c  -2+1 --> -1
c    ( b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧  p_230) -> ( b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0)
c  in CNF:
c    -b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨  b^{1, 231}_2
c    -b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_1
c    -b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨  b^{1, 231}_0
c  in DIMACS:
-1850 -1851  1852 -230  1853 0
-1850 -1851  1852 -230 -1854 0
-1850 -1851  1852 -230  1855 0

c  -1+1 --> 0
c    ( b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0 ∧  p_230) -> (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧ -b^{1, 231}_0)
c  in CNF:
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_2
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_1
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_0
c  in DIMACS:
-1850  1851 -1852 -230 -1853 0
-1850  1851 -1852 -230 -1854 0
-1850  1851 -1852 -230 -1855 0

c  0+1 --> 1
c    (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧  p_230) -> (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0)
c  in CNF:
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_2
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_1
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨  b^{1, 231}_0
c  in DIMACS:
 1850  1851  1852 -230 -1853 0
 1850  1851  1852 -230 -1854 0
 1850  1851  1852 -230  1855 0

c  1+1 --> 2
c    (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0 ∧  p_230) -> (-b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0)
c  in CNF:
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_2
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨  b^{1, 231}_1
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ -p_230 ∨ -b^{1, 231}_0
c  in DIMACS:
 1850  1851 -1852 -230 -1853 0
 1850  1851 -1852 -230  1854 0
 1850  1851 -1852 -230 -1855 0

c  2+1 --> break 
c    (-b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧  p_230) -> break
c  in CNF:
c     b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 1850 -1851  1852 -230 1162 0


c  2-1 --> 1
c    (-b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧ -p_230) -> (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0)
c  in CNF:
c     b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_2
c     b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_1
c     b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨  b^{1, 231}_0
c  in DIMACS:
 1850 -1851  1852  230 -1853 0
 1850 -1851  1852  230 -1854 0
 1850 -1851  1852  230  1855 0

c  1-1 --> 0
c    (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0 ∧ -p_230) -> (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧ -b^{1, 231}_0)
c  in CNF:
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_2
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_1
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_0
c  in DIMACS:
 1850  1851 -1852  230 -1853 0
 1850  1851 -1852  230 -1854 0
 1850  1851 -1852  230 -1855 0

c  0-1 --> -1
c    (-b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧ -p_230) -> ( b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0)
c  in CNF:
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨  b^{1, 231}_2
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_1
c     b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨  b^{1, 231}_0
c  in DIMACS:
 1850  1851  1852  230  1853 0
 1850  1851  1852  230 -1854 0
 1850  1851  1852  230  1855 0

c  -1-1 --> -2
c    ( b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧  b^{1, 230}_0 ∧ -p_230) -> ( b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0)
c  in CNF:
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨  b^{1, 231}_2
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨  b^{1, 231}_1
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨  p_230 ∨ -b^{1, 231}_0
c  in DIMACS:
-1850  1851 -1852  230  1853 0
-1850  1851 -1852  230  1854 0
-1850  1851 -1852  230 -1855 0

c  -2-1 --> break 
c    ( b^{1, 230}_2 ∧  b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨  b^{1, 230}_0 ∨  p_230 ∨ break
c  in DIMACS:
-1850 -1851  1852  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 230}_2 ∧ -b^{1, 230}_1 ∧ -b^{1, 230}_0 ∧ true) 
c  in CNF:
c    -b^{1, 230}_2 ∨  b^{1, 230}_1 ∨  b^{1, 230}_0 ∨ false 
c  in DIMACS:
-1850  1851  1852  0

c  3 does not represent an automaton state.
c    -(-b^{1, 230}_2 ∧  b^{1, 230}_1 ∧  b^{1, 230}_0 ∧ true) 
c  in CNF:
c     b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ false 
c  in DIMACS:
 1850 -1851 -1852  0
c  -3 does not represent an automaton state.
c    -( b^{1, 230}_2 ∧  b^{1, 230}_1 ∧  b^{1, 230}_0 ∧ true) 
c  in CNF:
c    -b^{1, 230}_2 ∨ -b^{1, 230}_1 ∨ -b^{1, 230}_0 ∨ false 
c  in DIMACS:
-1850 -1851 -1852  0

c i = 231
c  -2+1 --> -1
c    ( b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧  p_231) -> ( b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0)
c  in CNF:
c    -b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨  b^{1, 232}_2
c    -b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_1
c    -b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨  b^{1, 232}_0
c  in DIMACS:
-1853 -1854  1855 -231  1856 0
-1853 -1854  1855 -231 -1857 0
-1853 -1854  1855 -231  1858 0

c  -1+1 --> 0
c    ( b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0 ∧  p_231) -> (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧ -b^{1, 232}_0)
c  in CNF:
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_2
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_1
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_0
c  in DIMACS:
-1853  1854 -1855 -231 -1856 0
-1853  1854 -1855 -231 -1857 0
-1853  1854 -1855 -231 -1858 0

c  0+1 --> 1
c    (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧  p_231) -> (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0)
c  in CNF:
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_2
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_1
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨  b^{1, 232}_0
c  in DIMACS:
 1853  1854  1855 -231 -1856 0
 1853  1854  1855 -231 -1857 0
 1853  1854  1855 -231  1858 0

c  1+1 --> 2
c    (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0 ∧  p_231) -> (-b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0)
c  in CNF:
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_2
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨  b^{1, 232}_1
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ -p_231 ∨ -b^{1, 232}_0
c  in DIMACS:
 1853  1854 -1855 -231 -1856 0
 1853  1854 -1855 -231  1857 0
 1853  1854 -1855 -231 -1858 0

c  2+1 --> break 
c    (-b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧  p_231) -> break
c  in CNF:
c     b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 1853 -1854  1855 -231 1162 0


c  2-1 --> 1
c    (-b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧ -p_231) -> (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0)
c  in CNF:
c     b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_2
c     b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_1
c     b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨  b^{1, 232}_0
c  in DIMACS:
 1853 -1854  1855  231 -1856 0
 1853 -1854  1855  231 -1857 0
 1853 -1854  1855  231  1858 0

c  1-1 --> 0
c    (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0 ∧ -p_231) -> (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧ -b^{1, 232}_0)
c  in CNF:
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_2
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_1
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_0
c  in DIMACS:
 1853  1854 -1855  231 -1856 0
 1853  1854 -1855  231 -1857 0
 1853  1854 -1855  231 -1858 0

c  0-1 --> -1
c    (-b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧ -p_231) -> ( b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0)
c  in CNF:
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨  b^{1, 232}_2
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_1
c     b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨  b^{1, 232}_0
c  in DIMACS:
 1853  1854  1855  231  1856 0
 1853  1854  1855  231 -1857 0
 1853  1854  1855  231  1858 0

c  -1-1 --> -2
c    ( b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧  b^{1, 231}_0 ∧ -p_231) -> ( b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0)
c  in CNF:
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨  b^{1, 232}_2
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨  b^{1, 232}_1
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨  p_231 ∨ -b^{1, 232}_0
c  in DIMACS:
-1853  1854 -1855  231  1856 0
-1853  1854 -1855  231  1857 0
-1853  1854 -1855  231 -1858 0

c  -2-1 --> break 
c    ( b^{1, 231}_2 ∧  b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨  b^{1, 231}_0 ∨  p_231 ∨ break
c  in DIMACS:
-1853 -1854  1855  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 231}_2 ∧ -b^{1, 231}_1 ∧ -b^{1, 231}_0 ∧ true) 
c  in CNF:
c    -b^{1, 231}_2 ∨  b^{1, 231}_1 ∨  b^{1, 231}_0 ∨ false 
c  in DIMACS:
-1853  1854  1855  0

c  3 does not represent an automaton state.
c    -(-b^{1, 231}_2 ∧  b^{1, 231}_1 ∧  b^{1, 231}_0 ∧ true) 
c  in CNF:
c     b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ false 
c  in DIMACS:
 1853 -1854 -1855  0
c  -3 does not represent an automaton state.
c    -( b^{1, 231}_2 ∧  b^{1, 231}_1 ∧  b^{1, 231}_0 ∧ true) 
c  in CNF:
c    -b^{1, 231}_2 ∨ -b^{1, 231}_1 ∨ -b^{1, 231}_0 ∨ false 
c  in DIMACS:
-1853 -1854 -1855  0

c i = 232
c  -2+1 --> -1
c    ( b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧  p_232) -> ( b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0)
c  in CNF:
c    -b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨  b^{1, 233}_2
c    -b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_1
c    -b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨  b^{1, 233}_0
c  in DIMACS:
-1856 -1857  1858 -232  1859 0
-1856 -1857  1858 -232 -1860 0
-1856 -1857  1858 -232  1861 0

c  -1+1 --> 0
c    ( b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0 ∧  p_232) -> (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧ -b^{1, 233}_0)
c  in CNF:
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_2
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_1
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_0
c  in DIMACS:
-1856  1857 -1858 -232 -1859 0
-1856  1857 -1858 -232 -1860 0
-1856  1857 -1858 -232 -1861 0

c  0+1 --> 1
c    (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧  p_232) -> (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0)
c  in CNF:
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_2
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_1
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨  b^{1, 233}_0
c  in DIMACS:
 1856  1857  1858 -232 -1859 0
 1856  1857  1858 -232 -1860 0
 1856  1857  1858 -232  1861 0

c  1+1 --> 2
c    (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0 ∧  p_232) -> (-b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0)
c  in CNF:
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_2
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨  b^{1, 233}_1
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ -p_232 ∨ -b^{1, 233}_0
c  in DIMACS:
 1856  1857 -1858 -232 -1859 0
 1856  1857 -1858 -232  1860 0
 1856  1857 -1858 -232 -1861 0

c  2+1 --> break 
c    (-b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧  p_232) -> break
c  in CNF:
c     b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 1856 -1857  1858 -232 1162 0


c  2-1 --> 1
c    (-b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧ -p_232) -> (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0)
c  in CNF:
c     b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_2
c     b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_1
c     b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨  b^{1, 233}_0
c  in DIMACS:
 1856 -1857  1858  232 -1859 0
 1856 -1857  1858  232 -1860 0
 1856 -1857  1858  232  1861 0

c  1-1 --> 0
c    (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0 ∧ -p_232) -> (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧ -b^{1, 233}_0)
c  in CNF:
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_2
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_1
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_0
c  in DIMACS:
 1856  1857 -1858  232 -1859 0
 1856  1857 -1858  232 -1860 0
 1856  1857 -1858  232 -1861 0

c  0-1 --> -1
c    (-b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧ -p_232) -> ( b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0)
c  in CNF:
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨  b^{1, 233}_2
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_1
c     b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨  b^{1, 233}_0
c  in DIMACS:
 1856  1857  1858  232  1859 0
 1856  1857  1858  232 -1860 0
 1856  1857  1858  232  1861 0

c  -1-1 --> -2
c    ( b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧  b^{1, 232}_0 ∧ -p_232) -> ( b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0)
c  in CNF:
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨  b^{1, 233}_2
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨  b^{1, 233}_1
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨  p_232 ∨ -b^{1, 233}_0
c  in DIMACS:
-1856  1857 -1858  232  1859 0
-1856  1857 -1858  232  1860 0
-1856  1857 -1858  232 -1861 0

c  -2-1 --> break 
c    ( b^{1, 232}_2 ∧  b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨  b^{1, 232}_0 ∨  p_232 ∨ break
c  in DIMACS:
-1856 -1857  1858  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 232}_2 ∧ -b^{1, 232}_1 ∧ -b^{1, 232}_0 ∧ true) 
c  in CNF:
c    -b^{1, 232}_2 ∨  b^{1, 232}_1 ∨  b^{1, 232}_0 ∨ false 
c  in DIMACS:
-1856  1857  1858  0

c  3 does not represent an automaton state.
c    -(-b^{1, 232}_2 ∧  b^{1, 232}_1 ∧  b^{1, 232}_0 ∧ true) 
c  in CNF:
c     b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ false 
c  in DIMACS:
 1856 -1857 -1858  0
c  -3 does not represent an automaton state.
c    -( b^{1, 232}_2 ∧  b^{1, 232}_1 ∧  b^{1, 232}_0 ∧ true) 
c  in CNF:
c    -b^{1, 232}_2 ∨ -b^{1, 232}_1 ∨ -b^{1, 232}_0 ∨ false 
c  in DIMACS:
-1856 -1857 -1858  0

c i = 233
c  -2+1 --> -1
c    ( b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧  p_233) -> ( b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0)
c  in CNF:
c    -b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨  b^{1, 234}_2
c    -b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_1
c    -b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨  b^{1, 234}_0
c  in DIMACS:
-1859 -1860  1861 -233  1862 0
-1859 -1860  1861 -233 -1863 0
-1859 -1860  1861 -233  1864 0

c  -1+1 --> 0
c    ( b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0 ∧  p_233) -> (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧ -b^{1, 234}_0)
c  in CNF:
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_2
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_1
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_0
c  in DIMACS:
-1859  1860 -1861 -233 -1862 0
-1859  1860 -1861 -233 -1863 0
-1859  1860 -1861 -233 -1864 0

c  0+1 --> 1
c    (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧  p_233) -> (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0)
c  in CNF:
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_2
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_1
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨  b^{1, 234}_0
c  in DIMACS:
 1859  1860  1861 -233 -1862 0
 1859  1860  1861 -233 -1863 0
 1859  1860  1861 -233  1864 0

c  1+1 --> 2
c    (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0 ∧  p_233) -> (-b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0)
c  in CNF:
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_2
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨  b^{1, 234}_1
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ -p_233 ∨ -b^{1, 234}_0
c  in DIMACS:
 1859  1860 -1861 -233 -1862 0
 1859  1860 -1861 -233  1863 0
 1859  1860 -1861 -233 -1864 0

c  2+1 --> break 
c    (-b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧  p_233) -> break
c  in CNF:
c     b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ -p_233 ∨ break
c  in DIMACS:
 1859 -1860  1861 -233 1162 0


c  2-1 --> 1
c    (-b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧ -p_233) -> (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0)
c  in CNF:
c     b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_2
c     b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_1
c     b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨  b^{1, 234}_0
c  in DIMACS:
 1859 -1860  1861  233 -1862 0
 1859 -1860  1861  233 -1863 0
 1859 -1860  1861  233  1864 0

c  1-1 --> 0
c    (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0 ∧ -p_233) -> (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧ -b^{1, 234}_0)
c  in CNF:
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_2
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_1
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_0
c  in DIMACS:
 1859  1860 -1861  233 -1862 0
 1859  1860 -1861  233 -1863 0
 1859  1860 -1861  233 -1864 0

c  0-1 --> -1
c    (-b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧ -p_233) -> ( b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0)
c  in CNF:
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨  b^{1, 234}_2
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_1
c     b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨  b^{1, 234}_0
c  in DIMACS:
 1859  1860  1861  233  1862 0
 1859  1860  1861  233 -1863 0
 1859  1860  1861  233  1864 0

c  -1-1 --> -2
c    ( b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧  b^{1, 233}_0 ∧ -p_233) -> ( b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0)
c  in CNF:
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨  b^{1, 234}_2
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨  b^{1, 234}_1
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨  p_233 ∨ -b^{1, 234}_0
c  in DIMACS:
-1859  1860 -1861  233  1862 0
-1859  1860 -1861  233  1863 0
-1859  1860 -1861  233 -1864 0

c  -2-1 --> break 
c    ( b^{1, 233}_2 ∧  b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧ -p_233) -> break
c  in CNF:
c    -b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨  b^{1, 233}_0 ∨  p_233 ∨ break
c  in DIMACS:
-1859 -1860  1861  233 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 233}_2 ∧ -b^{1, 233}_1 ∧ -b^{1, 233}_0 ∧ true) 
c  in CNF:
c    -b^{1, 233}_2 ∨  b^{1, 233}_1 ∨  b^{1, 233}_0 ∨ false 
c  in DIMACS:
-1859  1860  1861  0

c  3 does not represent an automaton state.
c    -(-b^{1, 233}_2 ∧  b^{1, 233}_1 ∧  b^{1, 233}_0 ∧ true) 
c  in CNF:
c     b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ false 
c  in DIMACS:
 1859 -1860 -1861  0
c  -3 does not represent an automaton state.
c    -( b^{1, 233}_2 ∧  b^{1, 233}_1 ∧  b^{1, 233}_0 ∧ true) 
c  in CNF:
c    -b^{1, 233}_2 ∨ -b^{1, 233}_1 ∨ -b^{1, 233}_0 ∨ false 
c  in DIMACS:
-1859 -1860 -1861  0

c i = 234
c  -2+1 --> -1
c    ( b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧  p_234) -> ( b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0)
c  in CNF:
c    -b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨  b^{1, 235}_2
c    -b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_1
c    -b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨  b^{1, 235}_0
c  in DIMACS:
-1862 -1863  1864 -234  1865 0
-1862 -1863  1864 -234 -1866 0
-1862 -1863  1864 -234  1867 0

c  -1+1 --> 0
c    ( b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0 ∧  p_234) -> (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧ -b^{1, 235}_0)
c  in CNF:
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_2
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_1
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_0
c  in DIMACS:
-1862  1863 -1864 -234 -1865 0
-1862  1863 -1864 -234 -1866 0
-1862  1863 -1864 -234 -1867 0

c  0+1 --> 1
c    (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧  p_234) -> (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0)
c  in CNF:
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_2
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_1
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨  b^{1, 235}_0
c  in DIMACS:
 1862  1863  1864 -234 -1865 0
 1862  1863  1864 -234 -1866 0
 1862  1863  1864 -234  1867 0

c  1+1 --> 2
c    (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0 ∧  p_234) -> (-b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0)
c  in CNF:
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_2
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨  b^{1, 235}_1
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ -p_234 ∨ -b^{1, 235}_0
c  in DIMACS:
 1862  1863 -1864 -234 -1865 0
 1862  1863 -1864 -234  1866 0
 1862  1863 -1864 -234 -1867 0

c  2+1 --> break 
c    (-b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧  p_234) -> break
c  in CNF:
c     b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 1862 -1863  1864 -234 1162 0


c  2-1 --> 1
c    (-b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧ -p_234) -> (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0)
c  in CNF:
c     b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_2
c     b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_1
c     b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨  b^{1, 235}_0
c  in DIMACS:
 1862 -1863  1864  234 -1865 0
 1862 -1863  1864  234 -1866 0
 1862 -1863  1864  234  1867 0

c  1-1 --> 0
c    (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0 ∧ -p_234) -> (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧ -b^{1, 235}_0)
c  in CNF:
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_2
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_1
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_0
c  in DIMACS:
 1862  1863 -1864  234 -1865 0
 1862  1863 -1864  234 -1866 0
 1862  1863 -1864  234 -1867 0

c  0-1 --> -1
c    (-b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧ -p_234) -> ( b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0)
c  in CNF:
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨  b^{1, 235}_2
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_1
c     b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨  b^{1, 235}_0
c  in DIMACS:
 1862  1863  1864  234  1865 0
 1862  1863  1864  234 -1866 0
 1862  1863  1864  234  1867 0

c  -1-1 --> -2
c    ( b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧  b^{1, 234}_0 ∧ -p_234) -> ( b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0)
c  in CNF:
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨  b^{1, 235}_2
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨  b^{1, 235}_1
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨  p_234 ∨ -b^{1, 235}_0
c  in DIMACS:
-1862  1863 -1864  234  1865 0
-1862  1863 -1864  234  1866 0
-1862  1863 -1864  234 -1867 0

c  -2-1 --> break 
c    ( b^{1, 234}_2 ∧  b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨  b^{1, 234}_0 ∨  p_234 ∨ break
c  in DIMACS:
-1862 -1863  1864  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 234}_2 ∧ -b^{1, 234}_1 ∧ -b^{1, 234}_0 ∧ true) 
c  in CNF:
c    -b^{1, 234}_2 ∨  b^{1, 234}_1 ∨  b^{1, 234}_0 ∨ false 
c  in DIMACS:
-1862  1863  1864  0

c  3 does not represent an automaton state.
c    -(-b^{1, 234}_2 ∧  b^{1, 234}_1 ∧  b^{1, 234}_0 ∧ true) 
c  in CNF:
c     b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ false 
c  in DIMACS:
 1862 -1863 -1864  0
c  -3 does not represent an automaton state.
c    -( b^{1, 234}_2 ∧  b^{1, 234}_1 ∧  b^{1, 234}_0 ∧ true) 
c  in CNF:
c    -b^{1, 234}_2 ∨ -b^{1, 234}_1 ∨ -b^{1, 234}_0 ∨ false 
c  in DIMACS:
-1862 -1863 -1864  0

c i = 235
c  -2+1 --> -1
c    ( b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧  p_235) -> ( b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0)
c  in CNF:
c    -b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨  b^{1, 236}_2
c    -b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_1
c    -b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨  b^{1, 236}_0
c  in DIMACS:
-1865 -1866  1867 -235  1868 0
-1865 -1866  1867 -235 -1869 0
-1865 -1866  1867 -235  1870 0

c  -1+1 --> 0
c    ( b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0 ∧  p_235) -> (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧ -b^{1, 236}_0)
c  in CNF:
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_2
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_1
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_0
c  in DIMACS:
-1865  1866 -1867 -235 -1868 0
-1865  1866 -1867 -235 -1869 0
-1865  1866 -1867 -235 -1870 0

c  0+1 --> 1
c    (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧  p_235) -> (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0)
c  in CNF:
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_2
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_1
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨  b^{1, 236}_0
c  in DIMACS:
 1865  1866  1867 -235 -1868 0
 1865  1866  1867 -235 -1869 0
 1865  1866  1867 -235  1870 0

c  1+1 --> 2
c    (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0 ∧  p_235) -> (-b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0)
c  in CNF:
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_2
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨  b^{1, 236}_1
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ -p_235 ∨ -b^{1, 236}_0
c  in DIMACS:
 1865  1866 -1867 -235 -1868 0
 1865  1866 -1867 -235  1869 0
 1865  1866 -1867 -235 -1870 0

c  2+1 --> break 
c    (-b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧  p_235) -> break
c  in CNF:
c     b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ -p_235 ∨ break
c  in DIMACS:
 1865 -1866  1867 -235 1162 0


c  2-1 --> 1
c    (-b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧ -p_235) -> (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0)
c  in CNF:
c     b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_2
c     b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_1
c     b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨  b^{1, 236}_0
c  in DIMACS:
 1865 -1866  1867  235 -1868 0
 1865 -1866  1867  235 -1869 0
 1865 -1866  1867  235  1870 0

c  1-1 --> 0
c    (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0 ∧ -p_235) -> (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧ -b^{1, 236}_0)
c  in CNF:
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_2
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_1
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_0
c  in DIMACS:
 1865  1866 -1867  235 -1868 0
 1865  1866 -1867  235 -1869 0
 1865  1866 -1867  235 -1870 0

c  0-1 --> -1
c    (-b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧ -p_235) -> ( b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0)
c  in CNF:
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨  b^{1, 236}_2
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_1
c     b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨  b^{1, 236}_0
c  in DIMACS:
 1865  1866  1867  235  1868 0
 1865  1866  1867  235 -1869 0
 1865  1866  1867  235  1870 0

c  -1-1 --> -2
c    ( b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧  b^{1, 235}_0 ∧ -p_235) -> ( b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0)
c  in CNF:
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨  b^{1, 236}_2
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨  b^{1, 236}_1
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨  p_235 ∨ -b^{1, 236}_0
c  in DIMACS:
-1865  1866 -1867  235  1868 0
-1865  1866 -1867  235  1869 0
-1865  1866 -1867  235 -1870 0

c  -2-1 --> break 
c    ( b^{1, 235}_2 ∧  b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧ -p_235) -> break
c  in CNF:
c    -b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨  b^{1, 235}_0 ∨  p_235 ∨ break
c  in DIMACS:
-1865 -1866  1867  235 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 235}_2 ∧ -b^{1, 235}_1 ∧ -b^{1, 235}_0 ∧ true) 
c  in CNF:
c    -b^{1, 235}_2 ∨  b^{1, 235}_1 ∨  b^{1, 235}_0 ∨ false 
c  in DIMACS:
-1865  1866  1867  0

c  3 does not represent an automaton state.
c    -(-b^{1, 235}_2 ∧  b^{1, 235}_1 ∧  b^{1, 235}_0 ∧ true) 
c  in CNF:
c     b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ false 
c  in DIMACS:
 1865 -1866 -1867  0
c  -3 does not represent an automaton state.
c    -( b^{1, 235}_2 ∧  b^{1, 235}_1 ∧  b^{1, 235}_0 ∧ true) 
c  in CNF:
c    -b^{1, 235}_2 ∨ -b^{1, 235}_1 ∨ -b^{1, 235}_0 ∨ false 
c  in DIMACS:
-1865 -1866 -1867  0

c i = 236
c  -2+1 --> -1
c    ( b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧  p_236) -> ( b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0)
c  in CNF:
c    -b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨  b^{1, 237}_2
c    -b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_1
c    -b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨  b^{1, 237}_0
c  in DIMACS:
-1868 -1869  1870 -236  1871 0
-1868 -1869  1870 -236 -1872 0
-1868 -1869  1870 -236  1873 0

c  -1+1 --> 0
c    ( b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0 ∧  p_236) -> (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧ -b^{1, 237}_0)
c  in CNF:
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_2
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_1
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_0
c  in DIMACS:
-1868  1869 -1870 -236 -1871 0
-1868  1869 -1870 -236 -1872 0
-1868  1869 -1870 -236 -1873 0

c  0+1 --> 1
c    (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧  p_236) -> (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0)
c  in CNF:
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_2
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_1
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨  b^{1, 237}_0
c  in DIMACS:
 1868  1869  1870 -236 -1871 0
 1868  1869  1870 -236 -1872 0
 1868  1869  1870 -236  1873 0

c  1+1 --> 2
c    (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0 ∧  p_236) -> (-b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0)
c  in CNF:
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_2
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨  b^{1, 237}_1
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ -p_236 ∨ -b^{1, 237}_0
c  in DIMACS:
 1868  1869 -1870 -236 -1871 0
 1868  1869 -1870 -236  1872 0
 1868  1869 -1870 -236 -1873 0

c  2+1 --> break 
c    (-b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧  p_236) -> break
c  in CNF:
c     b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 1868 -1869  1870 -236 1162 0


c  2-1 --> 1
c    (-b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧ -p_236) -> (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0)
c  in CNF:
c     b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_2
c     b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_1
c     b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨  b^{1, 237}_0
c  in DIMACS:
 1868 -1869  1870  236 -1871 0
 1868 -1869  1870  236 -1872 0
 1868 -1869  1870  236  1873 0

c  1-1 --> 0
c    (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0 ∧ -p_236) -> (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧ -b^{1, 237}_0)
c  in CNF:
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_2
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_1
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_0
c  in DIMACS:
 1868  1869 -1870  236 -1871 0
 1868  1869 -1870  236 -1872 0
 1868  1869 -1870  236 -1873 0

c  0-1 --> -1
c    (-b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧ -p_236) -> ( b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0)
c  in CNF:
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨  b^{1, 237}_2
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_1
c     b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨  b^{1, 237}_0
c  in DIMACS:
 1868  1869  1870  236  1871 0
 1868  1869  1870  236 -1872 0
 1868  1869  1870  236  1873 0

c  -1-1 --> -2
c    ( b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧  b^{1, 236}_0 ∧ -p_236) -> ( b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0)
c  in CNF:
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨  b^{1, 237}_2
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨  b^{1, 237}_1
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨  p_236 ∨ -b^{1, 237}_0
c  in DIMACS:
-1868  1869 -1870  236  1871 0
-1868  1869 -1870  236  1872 0
-1868  1869 -1870  236 -1873 0

c  -2-1 --> break 
c    ( b^{1, 236}_2 ∧  b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨  b^{1, 236}_0 ∨  p_236 ∨ break
c  in DIMACS:
-1868 -1869  1870  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 236}_2 ∧ -b^{1, 236}_1 ∧ -b^{1, 236}_0 ∧ true) 
c  in CNF:
c    -b^{1, 236}_2 ∨  b^{1, 236}_1 ∨  b^{1, 236}_0 ∨ false 
c  in DIMACS:
-1868  1869  1870  0

c  3 does not represent an automaton state.
c    -(-b^{1, 236}_2 ∧  b^{1, 236}_1 ∧  b^{1, 236}_0 ∧ true) 
c  in CNF:
c     b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ false 
c  in DIMACS:
 1868 -1869 -1870  0
c  -3 does not represent an automaton state.
c    -( b^{1, 236}_2 ∧  b^{1, 236}_1 ∧  b^{1, 236}_0 ∧ true) 
c  in CNF:
c    -b^{1, 236}_2 ∨ -b^{1, 236}_1 ∨ -b^{1, 236}_0 ∨ false 
c  in DIMACS:
-1868 -1869 -1870  0

c i = 237
c  -2+1 --> -1
c    ( b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧  p_237) -> ( b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0)
c  in CNF:
c    -b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨  b^{1, 238}_2
c    -b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_1
c    -b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨  b^{1, 238}_0
c  in DIMACS:
-1871 -1872  1873 -237  1874 0
-1871 -1872  1873 -237 -1875 0
-1871 -1872  1873 -237  1876 0

c  -1+1 --> 0
c    ( b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0 ∧  p_237) -> (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧ -b^{1, 238}_0)
c  in CNF:
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_2
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_1
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_0
c  in DIMACS:
-1871  1872 -1873 -237 -1874 0
-1871  1872 -1873 -237 -1875 0
-1871  1872 -1873 -237 -1876 0

c  0+1 --> 1
c    (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧  p_237) -> (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0)
c  in CNF:
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_2
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_1
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨  b^{1, 238}_0
c  in DIMACS:
 1871  1872  1873 -237 -1874 0
 1871  1872  1873 -237 -1875 0
 1871  1872  1873 -237  1876 0

c  1+1 --> 2
c    (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0 ∧  p_237) -> (-b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0)
c  in CNF:
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_2
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨  b^{1, 238}_1
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ -p_237 ∨ -b^{1, 238}_0
c  in DIMACS:
 1871  1872 -1873 -237 -1874 0
 1871  1872 -1873 -237  1875 0
 1871  1872 -1873 -237 -1876 0

c  2+1 --> break 
c    (-b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧  p_237) -> break
c  in CNF:
c     b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ -p_237 ∨ break
c  in DIMACS:
 1871 -1872  1873 -237 1162 0


c  2-1 --> 1
c    (-b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧ -p_237) -> (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0)
c  in CNF:
c     b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_2
c     b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_1
c     b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨  b^{1, 238}_0
c  in DIMACS:
 1871 -1872  1873  237 -1874 0
 1871 -1872  1873  237 -1875 0
 1871 -1872  1873  237  1876 0

c  1-1 --> 0
c    (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0 ∧ -p_237) -> (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧ -b^{1, 238}_0)
c  in CNF:
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_2
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_1
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_0
c  in DIMACS:
 1871  1872 -1873  237 -1874 0
 1871  1872 -1873  237 -1875 0
 1871  1872 -1873  237 -1876 0

c  0-1 --> -1
c    (-b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧ -p_237) -> ( b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0)
c  in CNF:
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨  b^{1, 238}_2
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_1
c     b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨  b^{1, 238}_0
c  in DIMACS:
 1871  1872  1873  237  1874 0
 1871  1872  1873  237 -1875 0
 1871  1872  1873  237  1876 0

c  -1-1 --> -2
c    ( b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧  b^{1, 237}_0 ∧ -p_237) -> ( b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0)
c  in CNF:
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨  b^{1, 238}_2
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨  b^{1, 238}_1
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨  p_237 ∨ -b^{1, 238}_0
c  in DIMACS:
-1871  1872 -1873  237  1874 0
-1871  1872 -1873  237  1875 0
-1871  1872 -1873  237 -1876 0

c  -2-1 --> break 
c    ( b^{1, 237}_2 ∧  b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧ -p_237) -> break
c  in CNF:
c    -b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨  b^{1, 237}_0 ∨  p_237 ∨ break
c  in DIMACS:
-1871 -1872  1873  237 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 237}_2 ∧ -b^{1, 237}_1 ∧ -b^{1, 237}_0 ∧ true) 
c  in CNF:
c    -b^{1, 237}_2 ∨  b^{1, 237}_1 ∨  b^{1, 237}_0 ∨ false 
c  in DIMACS:
-1871  1872  1873  0

c  3 does not represent an automaton state.
c    -(-b^{1, 237}_2 ∧  b^{1, 237}_1 ∧  b^{1, 237}_0 ∧ true) 
c  in CNF:
c     b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ false 
c  in DIMACS:
 1871 -1872 -1873  0
c  -3 does not represent an automaton state.
c    -( b^{1, 237}_2 ∧  b^{1, 237}_1 ∧  b^{1, 237}_0 ∧ true) 
c  in CNF:
c    -b^{1, 237}_2 ∨ -b^{1, 237}_1 ∨ -b^{1, 237}_0 ∨ false 
c  in DIMACS:
-1871 -1872 -1873  0

c i = 238
c  -2+1 --> -1
c    ( b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧  p_238) -> ( b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0)
c  in CNF:
c    -b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨  b^{1, 239}_2
c    -b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_1
c    -b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨  b^{1, 239}_0
c  in DIMACS:
-1874 -1875  1876 -238  1877 0
-1874 -1875  1876 -238 -1878 0
-1874 -1875  1876 -238  1879 0

c  -1+1 --> 0
c    ( b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0 ∧  p_238) -> (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧ -b^{1, 239}_0)
c  in CNF:
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_2
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_1
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_0
c  in DIMACS:
-1874  1875 -1876 -238 -1877 0
-1874  1875 -1876 -238 -1878 0
-1874  1875 -1876 -238 -1879 0

c  0+1 --> 1
c    (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧  p_238) -> (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0)
c  in CNF:
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_2
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_1
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨  b^{1, 239}_0
c  in DIMACS:
 1874  1875  1876 -238 -1877 0
 1874  1875  1876 -238 -1878 0
 1874  1875  1876 -238  1879 0

c  1+1 --> 2
c    (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0 ∧  p_238) -> (-b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0)
c  in CNF:
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_2
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨  b^{1, 239}_1
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ -p_238 ∨ -b^{1, 239}_0
c  in DIMACS:
 1874  1875 -1876 -238 -1877 0
 1874  1875 -1876 -238  1878 0
 1874  1875 -1876 -238 -1879 0

c  2+1 --> break 
c    (-b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧  p_238) -> break
c  in CNF:
c     b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 1874 -1875  1876 -238 1162 0


c  2-1 --> 1
c    (-b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧ -p_238) -> (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0)
c  in CNF:
c     b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_2
c     b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_1
c     b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨  b^{1, 239}_0
c  in DIMACS:
 1874 -1875  1876  238 -1877 0
 1874 -1875  1876  238 -1878 0
 1874 -1875  1876  238  1879 0

c  1-1 --> 0
c    (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0 ∧ -p_238) -> (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧ -b^{1, 239}_0)
c  in CNF:
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_2
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_1
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_0
c  in DIMACS:
 1874  1875 -1876  238 -1877 0
 1874  1875 -1876  238 -1878 0
 1874  1875 -1876  238 -1879 0

c  0-1 --> -1
c    (-b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧ -p_238) -> ( b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0)
c  in CNF:
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨  b^{1, 239}_2
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_1
c     b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨  b^{1, 239}_0
c  in DIMACS:
 1874  1875  1876  238  1877 0
 1874  1875  1876  238 -1878 0
 1874  1875  1876  238  1879 0

c  -1-1 --> -2
c    ( b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧  b^{1, 238}_0 ∧ -p_238) -> ( b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0)
c  in CNF:
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨  b^{1, 239}_2
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨  b^{1, 239}_1
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨  p_238 ∨ -b^{1, 239}_0
c  in DIMACS:
-1874  1875 -1876  238  1877 0
-1874  1875 -1876  238  1878 0
-1874  1875 -1876  238 -1879 0

c  -2-1 --> break 
c    ( b^{1, 238}_2 ∧  b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨  b^{1, 238}_0 ∨  p_238 ∨ break
c  in DIMACS:
-1874 -1875  1876  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 238}_2 ∧ -b^{1, 238}_1 ∧ -b^{1, 238}_0 ∧ true) 
c  in CNF:
c    -b^{1, 238}_2 ∨  b^{1, 238}_1 ∨  b^{1, 238}_0 ∨ false 
c  in DIMACS:
-1874  1875  1876  0

c  3 does not represent an automaton state.
c    -(-b^{1, 238}_2 ∧  b^{1, 238}_1 ∧  b^{1, 238}_0 ∧ true) 
c  in CNF:
c     b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ false 
c  in DIMACS:
 1874 -1875 -1876  0
c  -3 does not represent an automaton state.
c    -( b^{1, 238}_2 ∧  b^{1, 238}_1 ∧  b^{1, 238}_0 ∧ true) 
c  in CNF:
c    -b^{1, 238}_2 ∨ -b^{1, 238}_1 ∨ -b^{1, 238}_0 ∨ false 
c  in DIMACS:
-1874 -1875 -1876  0

c i = 239
c  -2+1 --> -1
c    ( b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧  p_239) -> ( b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0)
c  in CNF:
c    -b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨  b^{1, 240}_2
c    -b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_1
c    -b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨  b^{1, 240}_0
c  in DIMACS:
-1877 -1878  1879 -239  1880 0
-1877 -1878  1879 -239 -1881 0
-1877 -1878  1879 -239  1882 0

c  -1+1 --> 0
c    ( b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0 ∧  p_239) -> (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧ -b^{1, 240}_0)
c  in CNF:
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_2
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_1
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_0
c  in DIMACS:
-1877  1878 -1879 -239 -1880 0
-1877  1878 -1879 -239 -1881 0
-1877  1878 -1879 -239 -1882 0

c  0+1 --> 1
c    (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧  p_239) -> (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0)
c  in CNF:
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_2
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_1
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨  b^{1, 240}_0
c  in DIMACS:
 1877  1878  1879 -239 -1880 0
 1877  1878  1879 -239 -1881 0
 1877  1878  1879 -239  1882 0

c  1+1 --> 2
c    (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0 ∧  p_239) -> (-b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0)
c  in CNF:
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_2
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨  b^{1, 240}_1
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ -p_239 ∨ -b^{1, 240}_0
c  in DIMACS:
 1877  1878 -1879 -239 -1880 0
 1877  1878 -1879 -239  1881 0
 1877  1878 -1879 -239 -1882 0

c  2+1 --> break 
c    (-b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧  p_239) -> break
c  in CNF:
c     b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ -p_239 ∨ break
c  in DIMACS:
 1877 -1878  1879 -239 1162 0


c  2-1 --> 1
c    (-b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧ -p_239) -> (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0)
c  in CNF:
c     b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_2
c     b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_1
c     b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨  b^{1, 240}_0
c  in DIMACS:
 1877 -1878  1879  239 -1880 0
 1877 -1878  1879  239 -1881 0
 1877 -1878  1879  239  1882 0

c  1-1 --> 0
c    (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0 ∧ -p_239) -> (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧ -b^{1, 240}_0)
c  in CNF:
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_2
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_1
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_0
c  in DIMACS:
 1877  1878 -1879  239 -1880 0
 1877  1878 -1879  239 -1881 0
 1877  1878 -1879  239 -1882 0

c  0-1 --> -1
c    (-b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧ -p_239) -> ( b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0)
c  in CNF:
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨  b^{1, 240}_2
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_1
c     b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨  b^{1, 240}_0
c  in DIMACS:
 1877  1878  1879  239  1880 0
 1877  1878  1879  239 -1881 0
 1877  1878  1879  239  1882 0

c  -1-1 --> -2
c    ( b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧  b^{1, 239}_0 ∧ -p_239) -> ( b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0)
c  in CNF:
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨  b^{1, 240}_2
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨  b^{1, 240}_1
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨  p_239 ∨ -b^{1, 240}_0
c  in DIMACS:
-1877  1878 -1879  239  1880 0
-1877  1878 -1879  239  1881 0
-1877  1878 -1879  239 -1882 0

c  -2-1 --> break 
c    ( b^{1, 239}_2 ∧  b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧ -p_239) -> break
c  in CNF:
c    -b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨  b^{1, 239}_0 ∨  p_239 ∨ break
c  in DIMACS:
-1877 -1878  1879  239 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 239}_2 ∧ -b^{1, 239}_1 ∧ -b^{1, 239}_0 ∧ true) 
c  in CNF:
c    -b^{1, 239}_2 ∨  b^{1, 239}_1 ∨  b^{1, 239}_0 ∨ false 
c  in DIMACS:
-1877  1878  1879  0

c  3 does not represent an automaton state.
c    -(-b^{1, 239}_2 ∧  b^{1, 239}_1 ∧  b^{1, 239}_0 ∧ true) 
c  in CNF:
c     b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ false 
c  in DIMACS:
 1877 -1878 -1879  0
c  -3 does not represent an automaton state.
c    -( b^{1, 239}_2 ∧  b^{1, 239}_1 ∧  b^{1, 239}_0 ∧ true) 
c  in CNF:
c    -b^{1, 239}_2 ∨ -b^{1, 239}_1 ∨ -b^{1, 239}_0 ∨ false 
c  in DIMACS:
-1877 -1878 -1879  0

c i = 240
c  -2+1 --> -1
c    ( b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧  p_240) -> ( b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0)
c  in CNF:
c    -b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨  b^{1, 241}_2
c    -b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_1
c    -b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨  b^{1, 241}_0
c  in DIMACS:
-1880 -1881  1882 -240  1883 0
-1880 -1881  1882 -240 -1884 0
-1880 -1881  1882 -240  1885 0

c  -1+1 --> 0
c    ( b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0 ∧  p_240) -> (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧ -b^{1, 241}_0)
c  in CNF:
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_2
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_1
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_0
c  in DIMACS:
-1880  1881 -1882 -240 -1883 0
-1880  1881 -1882 -240 -1884 0
-1880  1881 -1882 -240 -1885 0

c  0+1 --> 1
c    (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧  p_240) -> (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0)
c  in CNF:
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_2
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_1
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨  b^{1, 241}_0
c  in DIMACS:
 1880  1881  1882 -240 -1883 0
 1880  1881  1882 -240 -1884 0
 1880  1881  1882 -240  1885 0

c  1+1 --> 2
c    (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0 ∧  p_240) -> (-b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0)
c  in CNF:
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_2
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨  b^{1, 241}_1
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ -p_240 ∨ -b^{1, 241}_0
c  in DIMACS:
 1880  1881 -1882 -240 -1883 0
 1880  1881 -1882 -240  1884 0
 1880  1881 -1882 -240 -1885 0

c  2+1 --> break 
c    (-b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧  p_240) -> break
c  in CNF:
c     b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 1880 -1881  1882 -240 1162 0


c  2-1 --> 1
c    (-b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧ -p_240) -> (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0)
c  in CNF:
c     b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_2
c     b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_1
c     b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨  b^{1, 241}_0
c  in DIMACS:
 1880 -1881  1882  240 -1883 0
 1880 -1881  1882  240 -1884 0
 1880 -1881  1882  240  1885 0

c  1-1 --> 0
c    (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0 ∧ -p_240) -> (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧ -b^{1, 241}_0)
c  in CNF:
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_2
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_1
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_0
c  in DIMACS:
 1880  1881 -1882  240 -1883 0
 1880  1881 -1882  240 -1884 0
 1880  1881 -1882  240 -1885 0

c  0-1 --> -1
c    (-b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧ -p_240) -> ( b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0)
c  in CNF:
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨  b^{1, 241}_2
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_1
c     b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨  b^{1, 241}_0
c  in DIMACS:
 1880  1881  1882  240  1883 0
 1880  1881  1882  240 -1884 0
 1880  1881  1882  240  1885 0

c  -1-1 --> -2
c    ( b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧  b^{1, 240}_0 ∧ -p_240) -> ( b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0)
c  in CNF:
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨  b^{1, 241}_2
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨  b^{1, 241}_1
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨  p_240 ∨ -b^{1, 241}_0
c  in DIMACS:
-1880  1881 -1882  240  1883 0
-1880  1881 -1882  240  1884 0
-1880  1881 -1882  240 -1885 0

c  -2-1 --> break 
c    ( b^{1, 240}_2 ∧  b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨  b^{1, 240}_0 ∨  p_240 ∨ break
c  in DIMACS:
-1880 -1881  1882  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 240}_2 ∧ -b^{1, 240}_1 ∧ -b^{1, 240}_0 ∧ true) 
c  in CNF:
c    -b^{1, 240}_2 ∨  b^{1, 240}_1 ∨  b^{1, 240}_0 ∨ false 
c  in DIMACS:
-1880  1881  1882  0

c  3 does not represent an automaton state.
c    -(-b^{1, 240}_2 ∧  b^{1, 240}_1 ∧  b^{1, 240}_0 ∧ true) 
c  in CNF:
c     b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ false 
c  in DIMACS:
 1880 -1881 -1882  0
c  -3 does not represent an automaton state.
c    -( b^{1, 240}_2 ∧  b^{1, 240}_1 ∧  b^{1, 240}_0 ∧ true) 
c  in CNF:
c    -b^{1, 240}_2 ∨ -b^{1, 240}_1 ∨ -b^{1, 240}_0 ∨ false 
c  in DIMACS:
-1880 -1881 -1882  0

c i = 241
c  -2+1 --> -1
c    ( b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧  p_241) -> ( b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0)
c  in CNF:
c    -b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨  b^{1, 242}_2
c    -b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_1
c    -b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨  b^{1, 242}_0
c  in DIMACS:
-1883 -1884  1885 -241  1886 0
-1883 -1884  1885 -241 -1887 0
-1883 -1884  1885 -241  1888 0

c  -1+1 --> 0
c    ( b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0 ∧  p_241) -> (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧ -b^{1, 242}_0)
c  in CNF:
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_2
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_1
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_0
c  in DIMACS:
-1883  1884 -1885 -241 -1886 0
-1883  1884 -1885 -241 -1887 0
-1883  1884 -1885 -241 -1888 0

c  0+1 --> 1
c    (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧  p_241) -> (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0)
c  in CNF:
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_2
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_1
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨  b^{1, 242}_0
c  in DIMACS:
 1883  1884  1885 -241 -1886 0
 1883  1884  1885 -241 -1887 0
 1883  1884  1885 -241  1888 0

c  1+1 --> 2
c    (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0 ∧  p_241) -> (-b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0)
c  in CNF:
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_2
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨  b^{1, 242}_1
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ -p_241 ∨ -b^{1, 242}_0
c  in DIMACS:
 1883  1884 -1885 -241 -1886 0
 1883  1884 -1885 -241  1887 0
 1883  1884 -1885 -241 -1888 0

c  2+1 --> break 
c    (-b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧  p_241) -> break
c  in CNF:
c     b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ -p_241 ∨ break
c  in DIMACS:
 1883 -1884  1885 -241 1162 0


c  2-1 --> 1
c    (-b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧ -p_241) -> (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0)
c  in CNF:
c     b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_2
c     b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_1
c     b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨  b^{1, 242}_0
c  in DIMACS:
 1883 -1884  1885  241 -1886 0
 1883 -1884  1885  241 -1887 0
 1883 -1884  1885  241  1888 0

c  1-1 --> 0
c    (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0 ∧ -p_241) -> (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧ -b^{1, 242}_0)
c  in CNF:
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_2
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_1
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_0
c  in DIMACS:
 1883  1884 -1885  241 -1886 0
 1883  1884 -1885  241 -1887 0
 1883  1884 -1885  241 -1888 0

c  0-1 --> -1
c    (-b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧ -p_241) -> ( b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0)
c  in CNF:
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨  b^{1, 242}_2
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_1
c     b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨  b^{1, 242}_0
c  in DIMACS:
 1883  1884  1885  241  1886 0
 1883  1884  1885  241 -1887 0
 1883  1884  1885  241  1888 0

c  -1-1 --> -2
c    ( b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧  b^{1, 241}_0 ∧ -p_241) -> ( b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0)
c  in CNF:
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨  b^{1, 242}_2
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨  b^{1, 242}_1
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨  p_241 ∨ -b^{1, 242}_0
c  in DIMACS:
-1883  1884 -1885  241  1886 0
-1883  1884 -1885  241  1887 0
-1883  1884 -1885  241 -1888 0

c  -2-1 --> break 
c    ( b^{1, 241}_2 ∧  b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧ -p_241) -> break
c  in CNF:
c    -b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨  b^{1, 241}_0 ∨  p_241 ∨ break
c  in DIMACS:
-1883 -1884  1885  241 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 241}_2 ∧ -b^{1, 241}_1 ∧ -b^{1, 241}_0 ∧ true) 
c  in CNF:
c    -b^{1, 241}_2 ∨  b^{1, 241}_1 ∨  b^{1, 241}_0 ∨ false 
c  in DIMACS:
-1883  1884  1885  0

c  3 does not represent an automaton state.
c    -(-b^{1, 241}_2 ∧  b^{1, 241}_1 ∧  b^{1, 241}_0 ∧ true) 
c  in CNF:
c     b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ false 
c  in DIMACS:
 1883 -1884 -1885  0
c  -3 does not represent an automaton state.
c    -( b^{1, 241}_2 ∧  b^{1, 241}_1 ∧  b^{1, 241}_0 ∧ true) 
c  in CNF:
c    -b^{1, 241}_2 ∨ -b^{1, 241}_1 ∨ -b^{1, 241}_0 ∨ false 
c  in DIMACS:
-1883 -1884 -1885  0

c i = 242
c  -2+1 --> -1
c    ( b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧  p_242) -> ( b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0)
c  in CNF:
c    -b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨  b^{1, 243}_2
c    -b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_1
c    -b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨  b^{1, 243}_0
c  in DIMACS:
-1886 -1887  1888 -242  1889 0
-1886 -1887  1888 -242 -1890 0
-1886 -1887  1888 -242  1891 0

c  -1+1 --> 0
c    ( b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0 ∧  p_242) -> (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧ -b^{1, 243}_0)
c  in CNF:
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_2
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_1
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_0
c  in DIMACS:
-1886  1887 -1888 -242 -1889 0
-1886  1887 -1888 -242 -1890 0
-1886  1887 -1888 -242 -1891 0

c  0+1 --> 1
c    (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧  p_242) -> (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0)
c  in CNF:
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_2
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_1
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨  b^{1, 243}_0
c  in DIMACS:
 1886  1887  1888 -242 -1889 0
 1886  1887  1888 -242 -1890 0
 1886  1887  1888 -242  1891 0

c  1+1 --> 2
c    (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0 ∧  p_242) -> (-b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0)
c  in CNF:
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_2
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨  b^{1, 243}_1
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ -p_242 ∨ -b^{1, 243}_0
c  in DIMACS:
 1886  1887 -1888 -242 -1889 0
 1886  1887 -1888 -242  1890 0
 1886  1887 -1888 -242 -1891 0

c  2+1 --> break 
c    (-b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧  p_242) -> break
c  in CNF:
c     b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 1886 -1887  1888 -242 1162 0


c  2-1 --> 1
c    (-b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧ -p_242) -> (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0)
c  in CNF:
c     b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_2
c     b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_1
c     b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨  b^{1, 243}_0
c  in DIMACS:
 1886 -1887  1888  242 -1889 0
 1886 -1887  1888  242 -1890 0
 1886 -1887  1888  242  1891 0

c  1-1 --> 0
c    (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0 ∧ -p_242) -> (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧ -b^{1, 243}_0)
c  in CNF:
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_2
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_1
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_0
c  in DIMACS:
 1886  1887 -1888  242 -1889 0
 1886  1887 -1888  242 -1890 0
 1886  1887 -1888  242 -1891 0

c  0-1 --> -1
c    (-b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧ -p_242) -> ( b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0)
c  in CNF:
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨  b^{1, 243}_2
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_1
c     b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨  b^{1, 243}_0
c  in DIMACS:
 1886  1887  1888  242  1889 0
 1886  1887  1888  242 -1890 0
 1886  1887  1888  242  1891 0

c  -1-1 --> -2
c    ( b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧  b^{1, 242}_0 ∧ -p_242) -> ( b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0)
c  in CNF:
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨  b^{1, 243}_2
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨  b^{1, 243}_1
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨  p_242 ∨ -b^{1, 243}_0
c  in DIMACS:
-1886  1887 -1888  242  1889 0
-1886  1887 -1888  242  1890 0
-1886  1887 -1888  242 -1891 0

c  -2-1 --> break 
c    ( b^{1, 242}_2 ∧  b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨  b^{1, 242}_0 ∨  p_242 ∨ break
c  in DIMACS:
-1886 -1887  1888  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 242}_2 ∧ -b^{1, 242}_1 ∧ -b^{1, 242}_0 ∧ true) 
c  in CNF:
c    -b^{1, 242}_2 ∨  b^{1, 242}_1 ∨  b^{1, 242}_0 ∨ false 
c  in DIMACS:
-1886  1887  1888  0

c  3 does not represent an automaton state.
c    -(-b^{1, 242}_2 ∧  b^{1, 242}_1 ∧  b^{1, 242}_0 ∧ true) 
c  in CNF:
c     b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ false 
c  in DIMACS:
 1886 -1887 -1888  0
c  -3 does not represent an automaton state.
c    -( b^{1, 242}_2 ∧  b^{1, 242}_1 ∧  b^{1, 242}_0 ∧ true) 
c  in CNF:
c    -b^{1, 242}_2 ∨ -b^{1, 242}_1 ∨ -b^{1, 242}_0 ∨ false 
c  in DIMACS:
-1886 -1887 -1888  0

c i = 243
c  -2+1 --> -1
c    ( b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧  p_243) -> ( b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0)
c  in CNF:
c    -b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨  b^{1, 244}_2
c    -b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_1
c    -b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨  b^{1, 244}_0
c  in DIMACS:
-1889 -1890  1891 -243  1892 0
-1889 -1890  1891 -243 -1893 0
-1889 -1890  1891 -243  1894 0

c  -1+1 --> 0
c    ( b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0 ∧  p_243) -> (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧ -b^{1, 244}_0)
c  in CNF:
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_2
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_1
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_0
c  in DIMACS:
-1889  1890 -1891 -243 -1892 0
-1889  1890 -1891 -243 -1893 0
-1889  1890 -1891 -243 -1894 0

c  0+1 --> 1
c    (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧  p_243) -> (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0)
c  in CNF:
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_2
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_1
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨  b^{1, 244}_0
c  in DIMACS:
 1889  1890  1891 -243 -1892 0
 1889  1890  1891 -243 -1893 0
 1889  1890  1891 -243  1894 0

c  1+1 --> 2
c    (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0 ∧  p_243) -> (-b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0)
c  in CNF:
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_2
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨  b^{1, 244}_1
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ -p_243 ∨ -b^{1, 244}_0
c  in DIMACS:
 1889  1890 -1891 -243 -1892 0
 1889  1890 -1891 -243  1893 0
 1889  1890 -1891 -243 -1894 0

c  2+1 --> break 
c    (-b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧  p_243) -> break
c  in CNF:
c     b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 1889 -1890  1891 -243 1162 0


c  2-1 --> 1
c    (-b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧ -p_243) -> (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0)
c  in CNF:
c     b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_2
c     b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_1
c     b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨  b^{1, 244}_0
c  in DIMACS:
 1889 -1890  1891  243 -1892 0
 1889 -1890  1891  243 -1893 0
 1889 -1890  1891  243  1894 0

c  1-1 --> 0
c    (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0 ∧ -p_243) -> (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧ -b^{1, 244}_0)
c  in CNF:
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_2
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_1
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_0
c  in DIMACS:
 1889  1890 -1891  243 -1892 0
 1889  1890 -1891  243 -1893 0
 1889  1890 -1891  243 -1894 0

c  0-1 --> -1
c    (-b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧ -p_243) -> ( b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0)
c  in CNF:
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨  b^{1, 244}_2
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_1
c     b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨  b^{1, 244}_0
c  in DIMACS:
 1889  1890  1891  243  1892 0
 1889  1890  1891  243 -1893 0
 1889  1890  1891  243  1894 0

c  -1-1 --> -2
c    ( b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧  b^{1, 243}_0 ∧ -p_243) -> ( b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0)
c  in CNF:
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨  b^{1, 244}_2
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨  b^{1, 244}_1
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨  p_243 ∨ -b^{1, 244}_0
c  in DIMACS:
-1889  1890 -1891  243  1892 0
-1889  1890 -1891  243  1893 0
-1889  1890 -1891  243 -1894 0

c  -2-1 --> break 
c    ( b^{1, 243}_2 ∧  b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨  b^{1, 243}_0 ∨  p_243 ∨ break
c  in DIMACS:
-1889 -1890  1891  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 243}_2 ∧ -b^{1, 243}_1 ∧ -b^{1, 243}_0 ∧ true) 
c  in CNF:
c    -b^{1, 243}_2 ∨  b^{1, 243}_1 ∨  b^{1, 243}_0 ∨ false 
c  in DIMACS:
-1889  1890  1891  0

c  3 does not represent an automaton state.
c    -(-b^{1, 243}_2 ∧  b^{1, 243}_1 ∧  b^{1, 243}_0 ∧ true) 
c  in CNF:
c     b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ false 
c  in DIMACS:
 1889 -1890 -1891  0
c  -3 does not represent an automaton state.
c    -( b^{1, 243}_2 ∧  b^{1, 243}_1 ∧  b^{1, 243}_0 ∧ true) 
c  in CNF:
c    -b^{1, 243}_2 ∨ -b^{1, 243}_1 ∨ -b^{1, 243}_0 ∨ false 
c  in DIMACS:
-1889 -1890 -1891  0

c i = 244
c  -2+1 --> -1
c    ( b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧  p_244) -> ( b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0)
c  in CNF:
c    -b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨  b^{1, 245}_2
c    -b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_1
c    -b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨  b^{1, 245}_0
c  in DIMACS:
-1892 -1893  1894 -244  1895 0
-1892 -1893  1894 -244 -1896 0
-1892 -1893  1894 -244  1897 0

c  -1+1 --> 0
c    ( b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0 ∧  p_244) -> (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧ -b^{1, 245}_0)
c  in CNF:
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_2
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_1
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_0
c  in DIMACS:
-1892  1893 -1894 -244 -1895 0
-1892  1893 -1894 -244 -1896 0
-1892  1893 -1894 -244 -1897 0

c  0+1 --> 1
c    (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧  p_244) -> (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0)
c  in CNF:
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_2
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_1
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨  b^{1, 245}_0
c  in DIMACS:
 1892  1893  1894 -244 -1895 0
 1892  1893  1894 -244 -1896 0
 1892  1893  1894 -244  1897 0

c  1+1 --> 2
c    (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0 ∧  p_244) -> (-b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0)
c  in CNF:
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_2
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨  b^{1, 245}_1
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ -p_244 ∨ -b^{1, 245}_0
c  in DIMACS:
 1892  1893 -1894 -244 -1895 0
 1892  1893 -1894 -244  1896 0
 1892  1893 -1894 -244 -1897 0

c  2+1 --> break 
c    (-b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧  p_244) -> break
c  in CNF:
c     b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 1892 -1893  1894 -244 1162 0


c  2-1 --> 1
c    (-b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧ -p_244) -> (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0)
c  in CNF:
c     b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_2
c     b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_1
c     b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨  b^{1, 245}_0
c  in DIMACS:
 1892 -1893  1894  244 -1895 0
 1892 -1893  1894  244 -1896 0
 1892 -1893  1894  244  1897 0

c  1-1 --> 0
c    (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0 ∧ -p_244) -> (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧ -b^{1, 245}_0)
c  in CNF:
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_2
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_1
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_0
c  in DIMACS:
 1892  1893 -1894  244 -1895 0
 1892  1893 -1894  244 -1896 0
 1892  1893 -1894  244 -1897 0

c  0-1 --> -1
c    (-b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧ -p_244) -> ( b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0)
c  in CNF:
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨  b^{1, 245}_2
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_1
c     b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨  b^{1, 245}_0
c  in DIMACS:
 1892  1893  1894  244  1895 0
 1892  1893  1894  244 -1896 0
 1892  1893  1894  244  1897 0

c  -1-1 --> -2
c    ( b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧  b^{1, 244}_0 ∧ -p_244) -> ( b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0)
c  in CNF:
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨  b^{1, 245}_2
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨  b^{1, 245}_1
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨  p_244 ∨ -b^{1, 245}_0
c  in DIMACS:
-1892  1893 -1894  244  1895 0
-1892  1893 -1894  244  1896 0
-1892  1893 -1894  244 -1897 0

c  -2-1 --> break 
c    ( b^{1, 244}_2 ∧  b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨  b^{1, 244}_0 ∨  p_244 ∨ break
c  in DIMACS:
-1892 -1893  1894  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 244}_2 ∧ -b^{1, 244}_1 ∧ -b^{1, 244}_0 ∧ true) 
c  in CNF:
c    -b^{1, 244}_2 ∨  b^{1, 244}_1 ∨  b^{1, 244}_0 ∨ false 
c  in DIMACS:
-1892  1893  1894  0

c  3 does not represent an automaton state.
c    -(-b^{1, 244}_2 ∧  b^{1, 244}_1 ∧  b^{1, 244}_0 ∧ true) 
c  in CNF:
c     b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ false 
c  in DIMACS:
 1892 -1893 -1894  0
c  -3 does not represent an automaton state.
c    -( b^{1, 244}_2 ∧  b^{1, 244}_1 ∧  b^{1, 244}_0 ∧ true) 
c  in CNF:
c    -b^{1, 244}_2 ∨ -b^{1, 244}_1 ∨ -b^{1, 244}_0 ∨ false 
c  in DIMACS:
-1892 -1893 -1894  0

c i = 245
c  -2+1 --> -1
c    ( b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧  p_245) -> ( b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0)
c  in CNF:
c    -b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨  b^{1, 246}_2
c    -b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_1
c    -b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨  b^{1, 246}_0
c  in DIMACS:
-1895 -1896  1897 -245  1898 0
-1895 -1896  1897 -245 -1899 0
-1895 -1896  1897 -245  1900 0

c  -1+1 --> 0
c    ( b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0 ∧  p_245) -> (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧ -b^{1, 246}_0)
c  in CNF:
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_2
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_1
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_0
c  in DIMACS:
-1895  1896 -1897 -245 -1898 0
-1895  1896 -1897 -245 -1899 0
-1895  1896 -1897 -245 -1900 0

c  0+1 --> 1
c    (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧  p_245) -> (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0)
c  in CNF:
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_2
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_1
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨  b^{1, 246}_0
c  in DIMACS:
 1895  1896  1897 -245 -1898 0
 1895  1896  1897 -245 -1899 0
 1895  1896  1897 -245  1900 0

c  1+1 --> 2
c    (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0 ∧  p_245) -> (-b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0)
c  in CNF:
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_2
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨  b^{1, 246}_1
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ -p_245 ∨ -b^{1, 246}_0
c  in DIMACS:
 1895  1896 -1897 -245 -1898 0
 1895  1896 -1897 -245  1899 0
 1895  1896 -1897 -245 -1900 0

c  2+1 --> break 
c    (-b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧  p_245) -> break
c  in CNF:
c     b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 1895 -1896  1897 -245 1162 0


c  2-1 --> 1
c    (-b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧ -p_245) -> (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0)
c  in CNF:
c     b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_2
c     b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_1
c     b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨  b^{1, 246}_0
c  in DIMACS:
 1895 -1896  1897  245 -1898 0
 1895 -1896  1897  245 -1899 0
 1895 -1896  1897  245  1900 0

c  1-1 --> 0
c    (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0 ∧ -p_245) -> (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧ -b^{1, 246}_0)
c  in CNF:
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_2
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_1
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_0
c  in DIMACS:
 1895  1896 -1897  245 -1898 0
 1895  1896 -1897  245 -1899 0
 1895  1896 -1897  245 -1900 0

c  0-1 --> -1
c    (-b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧ -p_245) -> ( b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0)
c  in CNF:
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨  b^{1, 246}_2
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_1
c     b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨  b^{1, 246}_0
c  in DIMACS:
 1895  1896  1897  245  1898 0
 1895  1896  1897  245 -1899 0
 1895  1896  1897  245  1900 0

c  -1-1 --> -2
c    ( b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧  b^{1, 245}_0 ∧ -p_245) -> ( b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0)
c  in CNF:
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨  b^{1, 246}_2
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨  b^{1, 246}_1
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨  p_245 ∨ -b^{1, 246}_0
c  in DIMACS:
-1895  1896 -1897  245  1898 0
-1895  1896 -1897  245  1899 0
-1895  1896 -1897  245 -1900 0

c  -2-1 --> break 
c    ( b^{1, 245}_2 ∧  b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨  b^{1, 245}_0 ∨  p_245 ∨ break
c  in DIMACS:
-1895 -1896  1897  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 245}_2 ∧ -b^{1, 245}_1 ∧ -b^{1, 245}_0 ∧ true) 
c  in CNF:
c    -b^{1, 245}_2 ∨  b^{1, 245}_1 ∨  b^{1, 245}_0 ∨ false 
c  in DIMACS:
-1895  1896  1897  0

c  3 does not represent an automaton state.
c    -(-b^{1, 245}_2 ∧  b^{1, 245}_1 ∧  b^{1, 245}_0 ∧ true) 
c  in CNF:
c     b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ false 
c  in DIMACS:
 1895 -1896 -1897  0
c  -3 does not represent an automaton state.
c    -( b^{1, 245}_2 ∧  b^{1, 245}_1 ∧  b^{1, 245}_0 ∧ true) 
c  in CNF:
c    -b^{1, 245}_2 ∨ -b^{1, 245}_1 ∨ -b^{1, 245}_0 ∨ false 
c  in DIMACS:
-1895 -1896 -1897  0

c i = 246
c  -2+1 --> -1
c    ( b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧  p_246) -> ( b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0)
c  in CNF:
c    -b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨  b^{1, 247}_2
c    -b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_1
c    -b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨  b^{1, 247}_0
c  in DIMACS:
-1898 -1899  1900 -246  1901 0
-1898 -1899  1900 -246 -1902 0
-1898 -1899  1900 -246  1903 0

c  -1+1 --> 0
c    ( b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0 ∧  p_246) -> (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧ -b^{1, 247}_0)
c  in CNF:
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_2
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_1
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_0
c  in DIMACS:
-1898  1899 -1900 -246 -1901 0
-1898  1899 -1900 -246 -1902 0
-1898  1899 -1900 -246 -1903 0

c  0+1 --> 1
c    (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧  p_246) -> (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0)
c  in CNF:
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_2
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_1
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨  b^{1, 247}_0
c  in DIMACS:
 1898  1899  1900 -246 -1901 0
 1898  1899  1900 -246 -1902 0
 1898  1899  1900 -246  1903 0

c  1+1 --> 2
c    (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0 ∧  p_246) -> (-b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0)
c  in CNF:
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_2
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨  b^{1, 247}_1
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ -p_246 ∨ -b^{1, 247}_0
c  in DIMACS:
 1898  1899 -1900 -246 -1901 0
 1898  1899 -1900 -246  1902 0
 1898  1899 -1900 -246 -1903 0

c  2+1 --> break 
c    (-b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧  p_246) -> break
c  in CNF:
c     b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 1898 -1899  1900 -246 1162 0


c  2-1 --> 1
c    (-b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧ -p_246) -> (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0)
c  in CNF:
c     b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_2
c     b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_1
c     b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨  b^{1, 247}_0
c  in DIMACS:
 1898 -1899  1900  246 -1901 0
 1898 -1899  1900  246 -1902 0
 1898 -1899  1900  246  1903 0

c  1-1 --> 0
c    (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0 ∧ -p_246) -> (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧ -b^{1, 247}_0)
c  in CNF:
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_2
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_1
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_0
c  in DIMACS:
 1898  1899 -1900  246 -1901 0
 1898  1899 -1900  246 -1902 0
 1898  1899 -1900  246 -1903 0

c  0-1 --> -1
c    (-b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧ -p_246) -> ( b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0)
c  in CNF:
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨  b^{1, 247}_2
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_1
c     b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨  b^{1, 247}_0
c  in DIMACS:
 1898  1899  1900  246  1901 0
 1898  1899  1900  246 -1902 0
 1898  1899  1900  246  1903 0

c  -1-1 --> -2
c    ( b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧  b^{1, 246}_0 ∧ -p_246) -> ( b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0)
c  in CNF:
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨  b^{1, 247}_2
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨  b^{1, 247}_1
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨  p_246 ∨ -b^{1, 247}_0
c  in DIMACS:
-1898  1899 -1900  246  1901 0
-1898  1899 -1900  246  1902 0
-1898  1899 -1900  246 -1903 0

c  -2-1 --> break 
c    ( b^{1, 246}_2 ∧  b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨  b^{1, 246}_0 ∨  p_246 ∨ break
c  in DIMACS:
-1898 -1899  1900  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 246}_2 ∧ -b^{1, 246}_1 ∧ -b^{1, 246}_0 ∧ true) 
c  in CNF:
c    -b^{1, 246}_2 ∨  b^{1, 246}_1 ∨  b^{1, 246}_0 ∨ false 
c  in DIMACS:
-1898  1899  1900  0

c  3 does not represent an automaton state.
c    -(-b^{1, 246}_2 ∧  b^{1, 246}_1 ∧  b^{1, 246}_0 ∧ true) 
c  in CNF:
c     b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ false 
c  in DIMACS:
 1898 -1899 -1900  0
c  -3 does not represent an automaton state.
c    -( b^{1, 246}_2 ∧  b^{1, 246}_1 ∧  b^{1, 246}_0 ∧ true) 
c  in CNF:
c    -b^{1, 246}_2 ∨ -b^{1, 246}_1 ∨ -b^{1, 246}_0 ∨ false 
c  in DIMACS:
-1898 -1899 -1900  0

c i = 247
c  -2+1 --> -1
c    ( b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧  p_247) -> ( b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0)
c  in CNF:
c    -b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨  b^{1, 248}_2
c    -b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_1
c    -b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨  b^{1, 248}_0
c  in DIMACS:
-1901 -1902  1903 -247  1904 0
-1901 -1902  1903 -247 -1905 0
-1901 -1902  1903 -247  1906 0

c  -1+1 --> 0
c    ( b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0 ∧  p_247) -> (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧ -b^{1, 248}_0)
c  in CNF:
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_2
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_1
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_0
c  in DIMACS:
-1901  1902 -1903 -247 -1904 0
-1901  1902 -1903 -247 -1905 0
-1901  1902 -1903 -247 -1906 0

c  0+1 --> 1
c    (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧  p_247) -> (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0)
c  in CNF:
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_2
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_1
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨  b^{1, 248}_0
c  in DIMACS:
 1901  1902  1903 -247 -1904 0
 1901  1902  1903 -247 -1905 0
 1901  1902  1903 -247  1906 0

c  1+1 --> 2
c    (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0 ∧  p_247) -> (-b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0)
c  in CNF:
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_2
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨  b^{1, 248}_1
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ -p_247 ∨ -b^{1, 248}_0
c  in DIMACS:
 1901  1902 -1903 -247 -1904 0
 1901  1902 -1903 -247  1905 0
 1901  1902 -1903 -247 -1906 0

c  2+1 --> break 
c    (-b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧  p_247) -> break
c  in CNF:
c     b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ -p_247 ∨ break
c  in DIMACS:
 1901 -1902  1903 -247 1162 0


c  2-1 --> 1
c    (-b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧ -p_247) -> (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0)
c  in CNF:
c     b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_2
c     b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_1
c     b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨  b^{1, 248}_0
c  in DIMACS:
 1901 -1902  1903  247 -1904 0
 1901 -1902  1903  247 -1905 0
 1901 -1902  1903  247  1906 0

c  1-1 --> 0
c    (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0 ∧ -p_247) -> (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧ -b^{1, 248}_0)
c  in CNF:
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_2
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_1
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_0
c  in DIMACS:
 1901  1902 -1903  247 -1904 0
 1901  1902 -1903  247 -1905 0
 1901  1902 -1903  247 -1906 0

c  0-1 --> -1
c    (-b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧ -p_247) -> ( b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0)
c  in CNF:
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨  b^{1, 248}_2
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_1
c     b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨  b^{1, 248}_0
c  in DIMACS:
 1901  1902  1903  247  1904 0
 1901  1902  1903  247 -1905 0
 1901  1902  1903  247  1906 0

c  -1-1 --> -2
c    ( b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧  b^{1, 247}_0 ∧ -p_247) -> ( b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0)
c  in CNF:
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨  b^{1, 248}_2
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨  b^{1, 248}_1
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨  p_247 ∨ -b^{1, 248}_0
c  in DIMACS:
-1901  1902 -1903  247  1904 0
-1901  1902 -1903  247  1905 0
-1901  1902 -1903  247 -1906 0

c  -2-1 --> break 
c    ( b^{1, 247}_2 ∧  b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧ -p_247) -> break
c  in CNF:
c    -b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨  b^{1, 247}_0 ∨  p_247 ∨ break
c  in DIMACS:
-1901 -1902  1903  247 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 247}_2 ∧ -b^{1, 247}_1 ∧ -b^{1, 247}_0 ∧ true) 
c  in CNF:
c    -b^{1, 247}_2 ∨  b^{1, 247}_1 ∨  b^{1, 247}_0 ∨ false 
c  in DIMACS:
-1901  1902  1903  0

c  3 does not represent an automaton state.
c    -(-b^{1, 247}_2 ∧  b^{1, 247}_1 ∧  b^{1, 247}_0 ∧ true) 
c  in CNF:
c     b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ false 
c  in DIMACS:
 1901 -1902 -1903  0
c  -3 does not represent an automaton state.
c    -( b^{1, 247}_2 ∧  b^{1, 247}_1 ∧  b^{1, 247}_0 ∧ true) 
c  in CNF:
c    -b^{1, 247}_2 ∨ -b^{1, 247}_1 ∨ -b^{1, 247}_0 ∨ false 
c  in DIMACS:
-1901 -1902 -1903  0

c i = 248
c  -2+1 --> -1
c    ( b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧  p_248) -> ( b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0)
c  in CNF:
c    -b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨  b^{1, 249}_2
c    -b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_1
c    -b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨  b^{1, 249}_0
c  in DIMACS:
-1904 -1905  1906 -248  1907 0
-1904 -1905  1906 -248 -1908 0
-1904 -1905  1906 -248  1909 0

c  -1+1 --> 0
c    ( b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0 ∧  p_248) -> (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧ -b^{1, 249}_0)
c  in CNF:
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_2
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_1
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_0
c  in DIMACS:
-1904  1905 -1906 -248 -1907 0
-1904  1905 -1906 -248 -1908 0
-1904  1905 -1906 -248 -1909 0

c  0+1 --> 1
c    (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧  p_248) -> (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0)
c  in CNF:
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_2
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_1
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨  b^{1, 249}_0
c  in DIMACS:
 1904  1905  1906 -248 -1907 0
 1904  1905  1906 -248 -1908 0
 1904  1905  1906 -248  1909 0

c  1+1 --> 2
c    (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0 ∧  p_248) -> (-b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0)
c  in CNF:
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_2
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨  b^{1, 249}_1
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ -p_248 ∨ -b^{1, 249}_0
c  in DIMACS:
 1904  1905 -1906 -248 -1907 0
 1904  1905 -1906 -248  1908 0
 1904  1905 -1906 -248 -1909 0

c  2+1 --> break 
c    (-b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧  p_248) -> break
c  in CNF:
c     b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 1904 -1905  1906 -248 1162 0


c  2-1 --> 1
c    (-b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧ -p_248) -> (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0)
c  in CNF:
c     b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_2
c     b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_1
c     b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨  b^{1, 249}_0
c  in DIMACS:
 1904 -1905  1906  248 -1907 0
 1904 -1905  1906  248 -1908 0
 1904 -1905  1906  248  1909 0

c  1-1 --> 0
c    (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0 ∧ -p_248) -> (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧ -b^{1, 249}_0)
c  in CNF:
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_2
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_1
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_0
c  in DIMACS:
 1904  1905 -1906  248 -1907 0
 1904  1905 -1906  248 -1908 0
 1904  1905 -1906  248 -1909 0

c  0-1 --> -1
c    (-b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧ -p_248) -> ( b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0)
c  in CNF:
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨  b^{1, 249}_2
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_1
c     b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨  b^{1, 249}_0
c  in DIMACS:
 1904  1905  1906  248  1907 0
 1904  1905  1906  248 -1908 0
 1904  1905  1906  248  1909 0

c  -1-1 --> -2
c    ( b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧  b^{1, 248}_0 ∧ -p_248) -> ( b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0)
c  in CNF:
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨  b^{1, 249}_2
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨  b^{1, 249}_1
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨  p_248 ∨ -b^{1, 249}_0
c  in DIMACS:
-1904  1905 -1906  248  1907 0
-1904  1905 -1906  248  1908 0
-1904  1905 -1906  248 -1909 0

c  -2-1 --> break 
c    ( b^{1, 248}_2 ∧  b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨  b^{1, 248}_0 ∨  p_248 ∨ break
c  in DIMACS:
-1904 -1905  1906  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 248}_2 ∧ -b^{1, 248}_1 ∧ -b^{1, 248}_0 ∧ true) 
c  in CNF:
c    -b^{1, 248}_2 ∨  b^{1, 248}_1 ∨  b^{1, 248}_0 ∨ false 
c  in DIMACS:
-1904  1905  1906  0

c  3 does not represent an automaton state.
c    -(-b^{1, 248}_2 ∧  b^{1, 248}_1 ∧  b^{1, 248}_0 ∧ true) 
c  in CNF:
c     b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ false 
c  in DIMACS:
 1904 -1905 -1906  0
c  -3 does not represent an automaton state.
c    -( b^{1, 248}_2 ∧  b^{1, 248}_1 ∧  b^{1, 248}_0 ∧ true) 
c  in CNF:
c    -b^{1, 248}_2 ∨ -b^{1, 248}_1 ∨ -b^{1, 248}_0 ∨ false 
c  in DIMACS:
-1904 -1905 -1906  0

c i = 249
c  -2+1 --> -1
c    ( b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧  p_249) -> ( b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0)
c  in CNF:
c    -b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨  b^{1, 250}_2
c    -b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_1
c    -b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨  b^{1, 250}_0
c  in DIMACS:
-1907 -1908  1909 -249  1910 0
-1907 -1908  1909 -249 -1911 0
-1907 -1908  1909 -249  1912 0

c  -1+1 --> 0
c    ( b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0 ∧  p_249) -> (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧ -b^{1, 250}_0)
c  in CNF:
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_2
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_1
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_0
c  in DIMACS:
-1907  1908 -1909 -249 -1910 0
-1907  1908 -1909 -249 -1911 0
-1907  1908 -1909 -249 -1912 0

c  0+1 --> 1
c    (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧  p_249) -> (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0)
c  in CNF:
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_2
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_1
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨  b^{1, 250}_0
c  in DIMACS:
 1907  1908  1909 -249 -1910 0
 1907  1908  1909 -249 -1911 0
 1907  1908  1909 -249  1912 0

c  1+1 --> 2
c    (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0 ∧  p_249) -> (-b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0)
c  in CNF:
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_2
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨  b^{1, 250}_1
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ -p_249 ∨ -b^{1, 250}_0
c  in DIMACS:
 1907  1908 -1909 -249 -1910 0
 1907  1908 -1909 -249  1911 0
 1907  1908 -1909 -249 -1912 0

c  2+1 --> break 
c    (-b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧  p_249) -> break
c  in CNF:
c     b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ -p_249 ∨ break
c  in DIMACS:
 1907 -1908  1909 -249 1162 0


c  2-1 --> 1
c    (-b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧ -p_249) -> (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0)
c  in CNF:
c     b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_2
c     b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_1
c     b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨  b^{1, 250}_0
c  in DIMACS:
 1907 -1908  1909  249 -1910 0
 1907 -1908  1909  249 -1911 0
 1907 -1908  1909  249  1912 0

c  1-1 --> 0
c    (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0 ∧ -p_249) -> (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧ -b^{1, 250}_0)
c  in CNF:
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_2
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_1
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_0
c  in DIMACS:
 1907  1908 -1909  249 -1910 0
 1907  1908 -1909  249 -1911 0
 1907  1908 -1909  249 -1912 0

c  0-1 --> -1
c    (-b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧ -p_249) -> ( b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0)
c  in CNF:
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨  b^{1, 250}_2
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_1
c     b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨  b^{1, 250}_0
c  in DIMACS:
 1907  1908  1909  249  1910 0
 1907  1908  1909  249 -1911 0
 1907  1908  1909  249  1912 0

c  -1-1 --> -2
c    ( b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧  b^{1, 249}_0 ∧ -p_249) -> ( b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0)
c  in CNF:
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨  b^{1, 250}_2
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨  b^{1, 250}_1
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨  p_249 ∨ -b^{1, 250}_0
c  in DIMACS:
-1907  1908 -1909  249  1910 0
-1907  1908 -1909  249  1911 0
-1907  1908 -1909  249 -1912 0

c  -2-1 --> break 
c    ( b^{1, 249}_2 ∧  b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧ -p_249) -> break
c  in CNF:
c    -b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨  b^{1, 249}_0 ∨  p_249 ∨ break
c  in DIMACS:
-1907 -1908  1909  249 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 249}_2 ∧ -b^{1, 249}_1 ∧ -b^{1, 249}_0 ∧ true) 
c  in CNF:
c    -b^{1, 249}_2 ∨  b^{1, 249}_1 ∨  b^{1, 249}_0 ∨ false 
c  in DIMACS:
-1907  1908  1909  0

c  3 does not represent an automaton state.
c    -(-b^{1, 249}_2 ∧  b^{1, 249}_1 ∧  b^{1, 249}_0 ∧ true) 
c  in CNF:
c     b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ false 
c  in DIMACS:
 1907 -1908 -1909  0
c  -3 does not represent an automaton state.
c    -( b^{1, 249}_2 ∧  b^{1, 249}_1 ∧  b^{1, 249}_0 ∧ true) 
c  in CNF:
c    -b^{1, 249}_2 ∨ -b^{1, 249}_1 ∨ -b^{1, 249}_0 ∨ false 
c  in DIMACS:
-1907 -1908 -1909  0

c i = 250
c  -2+1 --> -1
c    ( b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧  p_250) -> ( b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0)
c  in CNF:
c    -b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨  b^{1, 251}_2
c    -b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_1
c    -b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨  b^{1, 251}_0
c  in DIMACS:
-1910 -1911  1912 -250  1913 0
-1910 -1911  1912 -250 -1914 0
-1910 -1911  1912 -250  1915 0

c  -1+1 --> 0
c    ( b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0 ∧  p_250) -> (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧ -b^{1, 251}_0)
c  in CNF:
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_2
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_1
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_0
c  in DIMACS:
-1910  1911 -1912 -250 -1913 0
-1910  1911 -1912 -250 -1914 0
-1910  1911 -1912 -250 -1915 0

c  0+1 --> 1
c    (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧  p_250) -> (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0)
c  in CNF:
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_2
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_1
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨  b^{1, 251}_0
c  in DIMACS:
 1910  1911  1912 -250 -1913 0
 1910  1911  1912 -250 -1914 0
 1910  1911  1912 -250  1915 0

c  1+1 --> 2
c    (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0 ∧  p_250) -> (-b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0)
c  in CNF:
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_2
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨  b^{1, 251}_1
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ -p_250 ∨ -b^{1, 251}_0
c  in DIMACS:
 1910  1911 -1912 -250 -1913 0
 1910  1911 -1912 -250  1914 0
 1910  1911 -1912 -250 -1915 0

c  2+1 --> break 
c    (-b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧  p_250) -> break
c  in CNF:
c     b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 1910 -1911  1912 -250 1162 0


c  2-1 --> 1
c    (-b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧ -p_250) -> (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0)
c  in CNF:
c     b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_2
c     b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_1
c     b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨  b^{1, 251}_0
c  in DIMACS:
 1910 -1911  1912  250 -1913 0
 1910 -1911  1912  250 -1914 0
 1910 -1911  1912  250  1915 0

c  1-1 --> 0
c    (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0 ∧ -p_250) -> (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧ -b^{1, 251}_0)
c  in CNF:
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_2
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_1
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_0
c  in DIMACS:
 1910  1911 -1912  250 -1913 0
 1910  1911 -1912  250 -1914 0
 1910  1911 -1912  250 -1915 0

c  0-1 --> -1
c    (-b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧ -p_250) -> ( b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0)
c  in CNF:
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨  b^{1, 251}_2
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_1
c     b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨  b^{1, 251}_0
c  in DIMACS:
 1910  1911  1912  250  1913 0
 1910  1911  1912  250 -1914 0
 1910  1911  1912  250  1915 0

c  -1-1 --> -2
c    ( b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧  b^{1, 250}_0 ∧ -p_250) -> ( b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0)
c  in CNF:
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨  b^{1, 251}_2
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨  b^{1, 251}_1
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨  p_250 ∨ -b^{1, 251}_0
c  in DIMACS:
-1910  1911 -1912  250  1913 0
-1910  1911 -1912  250  1914 0
-1910  1911 -1912  250 -1915 0

c  -2-1 --> break 
c    ( b^{1, 250}_2 ∧  b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨  b^{1, 250}_0 ∨  p_250 ∨ break
c  in DIMACS:
-1910 -1911  1912  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 250}_2 ∧ -b^{1, 250}_1 ∧ -b^{1, 250}_0 ∧ true) 
c  in CNF:
c    -b^{1, 250}_2 ∨  b^{1, 250}_1 ∨  b^{1, 250}_0 ∨ false 
c  in DIMACS:
-1910  1911  1912  0

c  3 does not represent an automaton state.
c    -(-b^{1, 250}_2 ∧  b^{1, 250}_1 ∧  b^{1, 250}_0 ∧ true) 
c  in CNF:
c     b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ false 
c  in DIMACS:
 1910 -1911 -1912  0
c  -3 does not represent an automaton state.
c    -( b^{1, 250}_2 ∧  b^{1, 250}_1 ∧  b^{1, 250}_0 ∧ true) 
c  in CNF:
c    -b^{1, 250}_2 ∨ -b^{1, 250}_1 ∨ -b^{1, 250}_0 ∨ false 
c  in DIMACS:
-1910 -1911 -1912  0

c i = 251
c  -2+1 --> -1
c    ( b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧  p_251) -> ( b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0)
c  in CNF:
c    -b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨  b^{1, 252}_2
c    -b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_1
c    -b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨  b^{1, 252}_0
c  in DIMACS:
-1913 -1914  1915 -251  1916 0
-1913 -1914  1915 -251 -1917 0
-1913 -1914  1915 -251  1918 0

c  -1+1 --> 0
c    ( b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0 ∧  p_251) -> (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧ -b^{1, 252}_0)
c  in CNF:
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_2
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_1
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_0
c  in DIMACS:
-1913  1914 -1915 -251 -1916 0
-1913  1914 -1915 -251 -1917 0
-1913  1914 -1915 -251 -1918 0

c  0+1 --> 1
c    (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧  p_251) -> (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0)
c  in CNF:
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_2
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_1
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨  b^{1, 252}_0
c  in DIMACS:
 1913  1914  1915 -251 -1916 0
 1913  1914  1915 -251 -1917 0
 1913  1914  1915 -251  1918 0

c  1+1 --> 2
c    (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0 ∧  p_251) -> (-b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0)
c  in CNF:
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_2
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨  b^{1, 252}_1
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ -p_251 ∨ -b^{1, 252}_0
c  in DIMACS:
 1913  1914 -1915 -251 -1916 0
 1913  1914 -1915 -251  1917 0
 1913  1914 -1915 -251 -1918 0

c  2+1 --> break 
c    (-b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧  p_251) -> break
c  in CNF:
c     b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ -p_251 ∨ break
c  in DIMACS:
 1913 -1914  1915 -251 1162 0


c  2-1 --> 1
c    (-b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧ -p_251) -> (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0)
c  in CNF:
c     b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_2
c     b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_1
c     b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨  b^{1, 252}_0
c  in DIMACS:
 1913 -1914  1915  251 -1916 0
 1913 -1914  1915  251 -1917 0
 1913 -1914  1915  251  1918 0

c  1-1 --> 0
c    (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0 ∧ -p_251) -> (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧ -b^{1, 252}_0)
c  in CNF:
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_2
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_1
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_0
c  in DIMACS:
 1913  1914 -1915  251 -1916 0
 1913  1914 -1915  251 -1917 0
 1913  1914 -1915  251 -1918 0

c  0-1 --> -1
c    (-b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧ -p_251) -> ( b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0)
c  in CNF:
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨  b^{1, 252}_2
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_1
c     b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨  b^{1, 252}_0
c  in DIMACS:
 1913  1914  1915  251  1916 0
 1913  1914  1915  251 -1917 0
 1913  1914  1915  251  1918 0

c  -1-1 --> -2
c    ( b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧  b^{1, 251}_0 ∧ -p_251) -> ( b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0)
c  in CNF:
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨  b^{1, 252}_2
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨  b^{1, 252}_1
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨  p_251 ∨ -b^{1, 252}_0
c  in DIMACS:
-1913  1914 -1915  251  1916 0
-1913  1914 -1915  251  1917 0
-1913  1914 -1915  251 -1918 0

c  -2-1 --> break 
c    ( b^{1, 251}_2 ∧  b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧ -p_251) -> break
c  in CNF:
c    -b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨  b^{1, 251}_0 ∨  p_251 ∨ break
c  in DIMACS:
-1913 -1914  1915  251 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 251}_2 ∧ -b^{1, 251}_1 ∧ -b^{1, 251}_0 ∧ true) 
c  in CNF:
c    -b^{1, 251}_2 ∨  b^{1, 251}_1 ∨  b^{1, 251}_0 ∨ false 
c  in DIMACS:
-1913  1914  1915  0

c  3 does not represent an automaton state.
c    -(-b^{1, 251}_2 ∧  b^{1, 251}_1 ∧  b^{1, 251}_0 ∧ true) 
c  in CNF:
c     b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ false 
c  in DIMACS:
 1913 -1914 -1915  0
c  -3 does not represent an automaton state.
c    -( b^{1, 251}_2 ∧  b^{1, 251}_1 ∧  b^{1, 251}_0 ∧ true) 
c  in CNF:
c    -b^{1, 251}_2 ∨ -b^{1, 251}_1 ∨ -b^{1, 251}_0 ∨ false 
c  in DIMACS:
-1913 -1914 -1915  0

c i = 252
c  -2+1 --> -1
c    ( b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧  p_252) -> ( b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0)
c  in CNF:
c    -b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨  b^{1, 253}_2
c    -b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_1
c    -b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨  b^{1, 253}_0
c  in DIMACS:
-1916 -1917  1918 -252  1919 0
-1916 -1917  1918 -252 -1920 0
-1916 -1917  1918 -252  1921 0

c  -1+1 --> 0
c    ( b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0 ∧  p_252) -> (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧ -b^{1, 253}_0)
c  in CNF:
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_2
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_1
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_0
c  in DIMACS:
-1916  1917 -1918 -252 -1919 0
-1916  1917 -1918 -252 -1920 0
-1916  1917 -1918 -252 -1921 0

c  0+1 --> 1
c    (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧  p_252) -> (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0)
c  in CNF:
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_2
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_1
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨  b^{1, 253}_0
c  in DIMACS:
 1916  1917  1918 -252 -1919 0
 1916  1917  1918 -252 -1920 0
 1916  1917  1918 -252  1921 0

c  1+1 --> 2
c    (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0 ∧  p_252) -> (-b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0)
c  in CNF:
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_2
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨  b^{1, 253}_1
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ -p_252 ∨ -b^{1, 253}_0
c  in DIMACS:
 1916  1917 -1918 -252 -1919 0
 1916  1917 -1918 -252  1920 0
 1916  1917 -1918 -252 -1921 0

c  2+1 --> break 
c    (-b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧  p_252) -> break
c  in CNF:
c     b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 1916 -1917  1918 -252 1162 0


c  2-1 --> 1
c    (-b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧ -p_252) -> (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0)
c  in CNF:
c     b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_2
c     b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_1
c     b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨  b^{1, 253}_0
c  in DIMACS:
 1916 -1917  1918  252 -1919 0
 1916 -1917  1918  252 -1920 0
 1916 -1917  1918  252  1921 0

c  1-1 --> 0
c    (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0 ∧ -p_252) -> (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧ -b^{1, 253}_0)
c  in CNF:
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_2
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_1
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_0
c  in DIMACS:
 1916  1917 -1918  252 -1919 0
 1916  1917 -1918  252 -1920 0
 1916  1917 -1918  252 -1921 0

c  0-1 --> -1
c    (-b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧ -p_252) -> ( b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0)
c  in CNF:
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨  b^{1, 253}_2
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_1
c     b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨  b^{1, 253}_0
c  in DIMACS:
 1916  1917  1918  252  1919 0
 1916  1917  1918  252 -1920 0
 1916  1917  1918  252  1921 0

c  -1-1 --> -2
c    ( b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧  b^{1, 252}_0 ∧ -p_252) -> ( b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0)
c  in CNF:
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨  b^{1, 253}_2
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨  b^{1, 253}_1
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨  p_252 ∨ -b^{1, 253}_0
c  in DIMACS:
-1916  1917 -1918  252  1919 0
-1916  1917 -1918  252  1920 0
-1916  1917 -1918  252 -1921 0

c  -2-1 --> break 
c    ( b^{1, 252}_2 ∧  b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨  b^{1, 252}_0 ∨  p_252 ∨ break
c  in DIMACS:
-1916 -1917  1918  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 252}_2 ∧ -b^{1, 252}_1 ∧ -b^{1, 252}_0 ∧ true) 
c  in CNF:
c    -b^{1, 252}_2 ∨  b^{1, 252}_1 ∨  b^{1, 252}_0 ∨ false 
c  in DIMACS:
-1916  1917  1918  0

c  3 does not represent an automaton state.
c    -(-b^{1, 252}_2 ∧  b^{1, 252}_1 ∧  b^{1, 252}_0 ∧ true) 
c  in CNF:
c     b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ false 
c  in DIMACS:
 1916 -1917 -1918  0
c  -3 does not represent an automaton state.
c    -( b^{1, 252}_2 ∧  b^{1, 252}_1 ∧  b^{1, 252}_0 ∧ true) 
c  in CNF:
c    -b^{1, 252}_2 ∨ -b^{1, 252}_1 ∨ -b^{1, 252}_0 ∨ false 
c  in DIMACS:
-1916 -1917 -1918  0

c i = 253
c  -2+1 --> -1
c    ( b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧  p_253) -> ( b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0)
c  in CNF:
c    -b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨  b^{1, 254}_2
c    -b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_1
c    -b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨  b^{1, 254}_0
c  in DIMACS:
-1919 -1920  1921 -253  1922 0
-1919 -1920  1921 -253 -1923 0
-1919 -1920  1921 -253  1924 0

c  -1+1 --> 0
c    ( b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0 ∧  p_253) -> (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧ -b^{1, 254}_0)
c  in CNF:
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_2
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_1
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_0
c  in DIMACS:
-1919  1920 -1921 -253 -1922 0
-1919  1920 -1921 -253 -1923 0
-1919  1920 -1921 -253 -1924 0

c  0+1 --> 1
c    (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧  p_253) -> (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0)
c  in CNF:
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_2
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_1
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨  b^{1, 254}_0
c  in DIMACS:
 1919  1920  1921 -253 -1922 0
 1919  1920  1921 -253 -1923 0
 1919  1920  1921 -253  1924 0

c  1+1 --> 2
c    (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0 ∧  p_253) -> (-b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0)
c  in CNF:
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_2
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨  b^{1, 254}_1
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ -p_253 ∨ -b^{1, 254}_0
c  in DIMACS:
 1919  1920 -1921 -253 -1922 0
 1919  1920 -1921 -253  1923 0
 1919  1920 -1921 -253 -1924 0

c  2+1 --> break 
c    (-b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧  p_253) -> break
c  in CNF:
c     b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ -p_253 ∨ break
c  in DIMACS:
 1919 -1920  1921 -253 1162 0


c  2-1 --> 1
c    (-b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧ -p_253) -> (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0)
c  in CNF:
c     b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_2
c     b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_1
c     b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨  b^{1, 254}_0
c  in DIMACS:
 1919 -1920  1921  253 -1922 0
 1919 -1920  1921  253 -1923 0
 1919 -1920  1921  253  1924 0

c  1-1 --> 0
c    (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0 ∧ -p_253) -> (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧ -b^{1, 254}_0)
c  in CNF:
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_2
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_1
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_0
c  in DIMACS:
 1919  1920 -1921  253 -1922 0
 1919  1920 -1921  253 -1923 0
 1919  1920 -1921  253 -1924 0

c  0-1 --> -1
c    (-b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧ -p_253) -> ( b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0)
c  in CNF:
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨  b^{1, 254}_2
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_1
c     b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨  b^{1, 254}_0
c  in DIMACS:
 1919  1920  1921  253  1922 0
 1919  1920  1921  253 -1923 0
 1919  1920  1921  253  1924 0

c  -1-1 --> -2
c    ( b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧  b^{1, 253}_0 ∧ -p_253) -> ( b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0)
c  in CNF:
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨  b^{1, 254}_2
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨  b^{1, 254}_1
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨  p_253 ∨ -b^{1, 254}_0
c  in DIMACS:
-1919  1920 -1921  253  1922 0
-1919  1920 -1921  253  1923 0
-1919  1920 -1921  253 -1924 0

c  -2-1 --> break 
c    ( b^{1, 253}_2 ∧  b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧ -p_253) -> break
c  in CNF:
c    -b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨  b^{1, 253}_0 ∨  p_253 ∨ break
c  in DIMACS:
-1919 -1920  1921  253 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 253}_2 ∧ -b^{1, 253}_1 ∧ -b^{1, 253}_0 ∧ true) 
c  in CNF:
c    -b^{1, 253}_2 ∨  b^{1, 253}_1 ∨  b^{1, 253}_0 ∨ false 
c  in DIMACS:
-1919  1920  1921  0

c  3 does not represent an automaton state.
c    -(-b^{1, 253}_2 ∧  b^{1, 253}_1 ∧  b^{1, 253}_0 ∧ true) 
c  in CNF:
c     b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ false 
c  in DIMACS:
 1919 -1920 -1921  0
c  -3 does not represent an automaton state.
c    -( b^{1, 253}_2 ∧  b^{1, 253}_1 ∧  b^{1, 253}_0 ∧ true) 
c  in CNF:
c    -b^{1, 253}_2 ∨ -b^{1, 253}_1 ∨ -b^{1, 253}_0 ∨ false 
c  in DIMACS:
-1919 -1920 -1921  0

c i = 254
c  -2+1 --> -1
c    ( b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧  p_254) -> ( b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0)
c  in CNF:
c    -b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨  b^{1, 255}_2
c    -b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_1
c    -b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨  b^{1, 255}_0
c  in DIMACS:
-1922 -1923  1924 -254  1925 0
-1922 -1923  1924 -254 -1926 0
-1922 -1923  1924 -254  1927 0

c  -1+1 --> 0
c    ( b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0 ∧  p_254) -> (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧ -b^{1, 255}_0)
c  in CNF:
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_2
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_1
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_0
c  in DIMACS:
-1922  1923 -1924 -254 -1925 0
-1922  1923 -1924 -254 -1926 0
-1922  1923 -1924 -254 -1927 0

c  0+1 --> 1
c    (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧  p_254) -> (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0)
c  in CNF:
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_2
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_1
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨  b^{1, 255}_0
c  in DIMACS:
 1922  1923  1924 -254 -1925 0
 1922  1923  1924 -254 -1926 0
 1922  1923  1924 -254  1927 0

c  1+1 --> 2
c    (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0 ∧  p_254) -> (-b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0)
c  in CNF:
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_2
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨  b^{1, 255}_1
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ -p_254 ∨ -b^{1, 255}_0
c  in DIMACS:
 1922  1923 -1924 -254 -1925 0
 1922  1923 -1924 -254  1926 0
 1922  1923 -1924 -254 -1927 0

c  2+1 --> break 
c    (-b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧  p_254) -> break
c  in CNF:
c     b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ -p_254 ∨ break
c  in DIMACS:
 1922 -1923  1924 -254 1162 0


c  2-1 --> 1
c    (-b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧ -p_254) -> (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0)
c  in CNF:
c     b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_2
c     b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_1
c     b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨  b^{1, 255}_0
c  in DIMACS:
 1922 -1923  1924  254 -1925 0
 1922 -1923  1924  254 -1926 0
 1922 -1923  1924  254  1927 0

c  1-1 --> 0
c    (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0 ∧ -p_254) -> (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧ -b^{1, 255}_0)
c  in CNF:
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_2
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_1
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_0
c  in DIMACS:
 1922  1923 -1924  254 -1925 0
 1922  1923 -1924  254 -1926 0
 1922  1923 -1924  254 -1927 0

c  0-1 --> -1
c    (-b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧ -p_254) -> ( b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0)
c  in CNF:
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨  b^{1, 255}_2
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_1
c     b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨  b^{1, 255}_0
c  in DIMACS:
 1922  1923  1924  254  1925 0
 1922  1923  1924  254 -1926 0
 1922  1923  1924  254  1927 0

c  -1-1 --> -2
c    ( b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧  b^{1, 254}_0 ∧ -p_254) -> ( b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0)
c  in CNF:
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨  b^{1, 255}_2
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨  b^{1, 255}_1
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨  p_254 ∨ -b^{1, 255}_0
c  in DIMACS:
-1922  1923 -1924  254  1925 0
-1922  1923 -1924  254  1926 0
-1922  1923 -1924  254 -1927 0

c  -2-1 --> break 
c    ( b^{1, 254}_2 ∧  b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧ -p_254) -> break
c  in CNF:
c    -b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨  b^{1, 254}_0 ∨  p_254 ∨ break
c  in DIMACS:
-1922 -1923  1924  254 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 254}_2 ∧ -b^{1, 254}_1 ∧ -b^{1, 254}_0 ∧ true) 
c  in CNF:
c    -b^{1, 254}_2 ∨  b^{1, 254}_1 ∨  b^{1, 254}_0 ∨ false 
c  in DIMACS:
-1922  1923  1924  0

c  3 does not represent an automaton state.
c    -(-b^{1, 254}_2 ∧  b^{1, 254}_1 ∧  b^{1, 254}_0 ∧ true) 
c  in CNF:
c     b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ false 
c  in DIMACS:
 1922 -1923 -1924  0
c  -3 does not represent an automaton state.
c    -( b^{1, 254}_2 ∧  b^{1, 254}_1 ∧  b^{1, 254}_0 ∧ true) 
c  in CNF:
c    -b^{1, 254}_2 ∨ -b^{1, 254}_1 ∨ -b^{1, 254}_0 ∨ false 
c  in DIMACS:
-1922 -1923 -1924  0

c i = 255
c  -2+1 --> -1
c    ( b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧  p_255) -> ( b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0)
c  in CNF:
c    -b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨  b^{1, 256}_2
c    -b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_1
c    -b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨  b^{1, 256}_0
c  in DIMACS:
-1925 -1926  1927 -255  1928 0
-1925 -1926  1927 -255 -1929 0
-1925 -1926  1927 -255  1930 0

c  -1+1 --> 0
c    ( b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0 ∧  p_255) -> (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧ -b^{1, 256}_0)
c  in CNF:
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_2
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_1
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_0
c  in DIMACS:
-1925  1926 -1927 -255 -1928 0
-1925  1926 -1927 -255 -1929 0
-1925  1926 -1927 -255 -1930 0

c  0+1 --> 1
c    (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧  p_255) -> (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0)
c  in CNF:
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_2
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_1
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨  b^{1, 256}_0
c  in DIMACS:
 1925  1926  1927 -255 -1928 0
 1925  1926  1927 -255 -1929 0
 1925  1926  1927 -255  1930 0

c  1+1 --> 2
c    (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0 ∧  p_255) -> (-b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0)
c  in CNF:
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_2
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨  b^{1, 256}_1
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ -p_255 ∨ -b^{1, 256}_0
c  in DIMACS:
 1925  1926 -1927 -255 -1928 0
 1925  1926 -1927 -255  1929 0
 1925  1926 -1927 -255 -1930 0

c  2+1 --> break 
c    (-b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧  p_255) -> break
c  in CNF:
c     b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 1925 -1926  1927 -255 1162 0


c  2-1 --> 1
c    (-b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧ -p_255) -> (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0)
c  in CNF:
c     b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_2
c     b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_1
c     b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨  b^{1, 256}_0
c  in DIMACS:
 1925 -1926  1927  255 -1928 0
 1925 -1926  1927  255 -1929 0
 1925 -1926  1927  255  1930 0

c  1-1 --> 0
c    (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0 ∧ -p_255) -> (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧ -b^{1, 256}_0)
c  in CNF:
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_2
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_1
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_0
c  in DIMACS:
 1925  1926 -1927  255 -1928 0
 1925  1926 -1927  255 -1929 0
 1925  1926 -1927  255 -1930 0

c  0-1 --> -1
c    (-b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧ -p_255) -> ( b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0)
c  in CNF:
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨  b^{1, 256}_2
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_1
c     b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨  b^{1, 256}_0
c  in DIMACS:
 1925  1926  1927  255  1928 0
 1925  1926  1927  255 -1929 0
 1925  1926  1927  255  1930 0

c  -1-1 --> -2
c    ( b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧  b^{1, 255}_0 ∧ -p_255) -> ( b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0)
c  in CNF:
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨  b^{1, 256}_2
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨  b^{1, 256}_1
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨  p_255 ∨ -b^{1, 256}_0
c  in DIMACS:
-1925  1926 -1927  255  1928 0
-1925  1926 -1927  255  1929 0
-1925  1926 -1927  255 -1930 0

c  -2-1 --> break 
c    ( b^{1, 255}_2 ∧  b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨  b^{1, 255}_0 ∨  p_255 ∨ break
c  in DIMACS:
-1925 -1926  1927  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 255}_2 ∧ -b^{1, 255}_1 ∧ -b^{1, 255}_0 ∧ true) 
c  in CNF:
c    -b^{1, 255}_2 ∨  b^{1, 255}_1 ∨  b^{1, 255}_0 ∨ false 
c  in DIMACS:
-1925  1926  1927  0

c  3 does not represent an automaton state.
c    -(-b^{1, 255}_2 ∧  b^{1, 255}_1 ∧  b^{1, 255}_0 ∧ true) 
c  in CNF:
c     b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ false 
c  in DIMACS:
 1925 -1926 -1927  0
c  -3 does not represent an automaton state.
c    -( b^{1, 255}_2 ∧  b^{1, 255}_1 ∧  b^{1, 255}_0 ∧ true) 
c  in CNF:
c    -b^{1, 255}_2 ∨ -b^{1, 255}_1 ∨ -b^{1, 255}_0 ∨ false 
c  in DIMACS:
-1925 -1926 -1927  0

c i = 256
c  -2+1 --> -1
c    ( b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧  p_256) -> ( b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0)
c  in CNF:
c    -b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨  b^{1, 257}_2
c    -b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_1
c    -b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨  b^{1, 257}_0
c  in DIMACS:
-1928 -1929  1930 -256  1931 0
-1928 -1929  1930 -256 -1932 0
-1928 -1929  1930 -256  1933 0

c  -1+1 --> 0
c    ( b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0 ∧  p_256) -> (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧ -b^{1, 257}_0)
c  in CNF:
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_2
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_1
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_0
c  in DIMACS:
-1928  1929 -1930 -256 -1931 0
-1928  1929 -1930 -256 -1932 0
-1928  1929 -1930 -256 -1933 0

c  0+1 --> 1
c    (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧  p_256) -> (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0)
c  in CNF:
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_2
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_1
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨  b^{1, 257}_0
c  in DIMACS:
 1928  1929  1930 -256 -1931 0
 1928  1929  1930 -256 -1932 0
 1928  1929  1930 -256  1933 0

c  1+1 --> 2
c    (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0 ∧  p_256) -> (-b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0)
c  in CNF:
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_2
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨  b^{1, 257}_1
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ -p_256 ∨ -b^{1, 257}_0
c  in DIMACS:
 1928  1929 -1930 -256 -1931 0
 1928  1929 -1930 -256  1932 0
 1928  1929 -1930 -256 -1933 0

c  2+1 --> break 
c    (-b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧  p_256) -> break
c  in CNF:
c     b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 1928 -1929  1930 -256 1162 0


c  2-1 --> 1
c    (-b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧ -p_256) -> (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0)
c  in CNF:
c     b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_2
c     b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_1
c     b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨  b^{1, 257}_0
c  in DIMACS:
 1928 -1929  1930  256 -1931 0
 1928 -1929  1930  256 -1932 0
 1928 -1929  1930  256  1933 0

c  1-1 --> 0
c    (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0 ∧ -p_256) -> (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧ -b^{1, 257}_0)
c  in CNF:
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_2
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_1
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_0
c  in DIMACS:
 1928  1929 -1930  256 -1931 0
 1928  1929 -1930  256 -1932 0
 1928  1929 -1930  256 -1933 0

c  0-1 --> -1
c    (-b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧ -p_256) -> ( b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0)
c  in CNF:
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨  b^{1, 257}_2
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_1
c     b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨  b^{1, 257}_0
c  in DIMACS:
 1928  1929  1930  256  1931 0
 1928  1929  1930  256 -1932 0
 1928  1929  1930  256  1933 0

c  -1-1 --> -2
c    ( b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧  b^{1, 256}_0 ∧ -p_256) -> ( b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0)
c  in CNF:
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨  b^{1, 257}_2
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨  b^{1, 257}_1
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨  p_256 ∨ -b^{1, 257}_0
c  in DIMACS:
-1928  1929 -1930  256  1931 0
-1928  1929 -1930  256  1932 0
-1928  1929 -1930  256 -1933 0

c  -2-1 --> break 
c    ( b^{1, 256}_2 ∧  b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨  b^{1, 256}_0 ∨  p_256 ∨ break
c  in DIMACS:
-1928 -1929  1930  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 256}_2 ∧ -b^{1, 256}_1 ∧ -b^{1, 256}_0 ∧ true) 
c  in CNF:
c    -b^{1, 256}_2 ∨  b^{1, 256}_1 ∨  b^{1, 256}_0 ∨ false 
c  in DIMACS:
-1928  1929  1930  0

c  3 does not represent an automaton state.
c    -(-b^{1, 256}_2 ∧  b^{1, 256}_1 ∧  b^{1, 256}_0 ∧ true) 
c  in CNF:
c     b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ false 
c  in DIMACS:
 1928 -1929 -1930  0
c  -3 does not represent an automaton state.
c    -( b^{1, 256}_2 ∧  b^{1, 256}_1 ∧  b^{1, 256}_0 ∧ true) 
c  in CNF:
c    -b^{1, 256}_2 ∨ -b^{1, 256}_1 ∨ -b^{1, 256}_0 ∨ false 
c  in DIMACS:
-1928 -1929 -1930  0

c i = 257
c  -2+1 --> -1
c    ( b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧  p_257) -> ( b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0)
c  in CNF:
c    -b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨  b^{1, 258}_2
c    -b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_1
c    -b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨  b^{1, 258}_0
c  in DIMACS:
-1931 -1932  1933 -257  1934 0
-1931 -1932  1933 -257 -1935 0
-1931 -1932  1933 -257  1936 0

c  -1+1 --> 0
c    ( b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0 ∧  p_257) -> (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧ -b^{1, 258}_0)
c  in CNF:
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_2
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_1
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_0
c  in DIMACS:
-1931  1932 -1933 -257 -1934 0
-1931  1932 -1933 -257 -1935 0
-1931  1932 -1933 -257 -1936 0

c  0+1 --> 1
c    (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧  p_257) -> (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0)
c  in CNF:
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_2
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_1
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨  b^{1, 258}_0
c  in DIMACS:
 1931  1932  1933 -257 -1934 0
 1931  1932  1933 -257 -1935 0
 1931  1932  1933 -257  1936 0

c  1+1 --> 2
c    (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0 ∧  p_257) -> (-b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0)
c  in CNF:
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_2
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨  b^{1, 258}_1
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ -p_257 ∨ -b^{1, 258}_0
c  in DIMACS:
 1931  1932 -1933 -257 -1934 0
 1931  1932 -1933 -257  1935 0
 1931  1932 -1933 -257 -1936 0

c  2+1 --> break 
c    (-b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧  p_257) -> break
c  in CNF:
c     b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ -p_257 ∨ break
c  in DIMACS:
 1931 -1932  1933 -257 1162 0


c  2-1 --> 1
c    (-b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧ -p_257) -> (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0)
c  in CNF:
c     b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_2
c     b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_1
c     b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨  b^{1, 258}_0
c  in DIMACS:
 1931 -1932  1933  257 -1934 0
 1931 -1932  1933  257 -1935 0
 1931 -1932  1933  257  1936 0

c  1-1 --> 0
c    (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0 ∧ -p_257) -> (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧ -b^{1, 258}_0)
c  in CNF:
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_2
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_1
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_0
c  in DIMACS:
 1931  1932 -1933  257 -1934 0
 1931  1932 -1933  257 -1935 0
 1931  1932 -1933  257 -1936 0

c  0-1 --> -1
c    (-b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧ -p_257) -> ( b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0)
c  in CNF:
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨  b^{1, 258}_2
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_1
c     b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨  b^{1, 258}_0
c  in DIMACS:
 1931  1932  1933  257  1934 0
 1931  1932  1933  257 -1935 0
 1931  1932  1933  257  1936 0

c  -1-1 --> -2
c    ( b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧  b^{1, 257}_0 ∧ -p_257) -> ( b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0)
c  in CNF:
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨  b^{1, 258}_2
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨  b^{1, 258}_1
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨  p_257 ∨ -b^{1, 258}_0
c  in DIMACS:
-1931  1932 -1933  257  1934 0
-1931  1932 -1933  257  1935 0
-1931  1932 -1933  257 -1936 0

c  -2-1 --> break 
c    ( b^{1, 257}_2 ∧  b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧ -p_257) -> break
c  in CNF:
c    -b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨  b^{1, 257}_0 ∨  p_257 ∨ break
c  in DIMACS:
-1931 -1932  1933  257 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 257}_2 ∧ -b^{1, 257}_1 ∧ -b^{1, 257}_0 ∧ true) 
c  in CNF:
c    -b^{1, 257}_2 ∨  b^{1, 257}_1 ∨  b^{1, 257}_0 ∨ false 
c  in DIMACS:
-1931  1932  1933  0

c  3 does not represent an automaton state.
c    -(-b^{1, 257}_2 ∧  b^{1, 257}_1 ∧  b^{1, 257}_0 ∧ true) 
c  in CNF:
c     b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ false 
c  in DIMACS:
 1931 -1932 -1933  0
c  -3 does not represent an automaton state.
c    -( b^{1, 257}_2 ∧  b^{1, 257}_1 ∧  b^{1, 257}_0 ∧ true) 
c  in CNF:
c    -b^{1, 257}_2 ∨ -b^{1, 257}_1 ∨ -b^{1, 257}_0 ∨ false 
c  in DIMACS:
-1931 -1932 -1933  0

c i = 258
c  -2+1 --> -1
c    ( b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧  p_258) -> ( b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0)
c  in CNF:
c    -b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨  b^{1, 259}_2
c    -b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_1
c    -b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨  b^{1, 259}_0
c  in DIMACS:
-1934 -1935  1936 -258  1937 0
-1934 -1935  1936 -258 -1938 0
-1934 -1935  1936 -258  1939 0

c  -1+1 --> 0
c    ( b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0 ∧  p_258) -> (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧ -b^{1, 259}_0)
c  in CNF:
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_2
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_1
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_0
c  in DIMACS:
-1934  1935 -1936 -258 -1937 0
-1934  1935 -1936 -258 -1938 0
-1934  1935 -1936 -258 -1939 0

c  0+1 --> 1
c    (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧  p_258) -> (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0)
c  in CNF:
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_2
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_1
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨  b^{1, 259}_0
c  in DIMACS:
 1934  1935  1936 -258 -1937 0
 1934  1935  1936 -258 -1938 0
 1934  1935  1936 -258  1939 0

c  1+1 --> 2
c    (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0 ∧  p_258) -> (-b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0)
c  in CNF:
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_2
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨  b^{1, 259}_1
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ -p_258 ∨ -b^{1, 259}_0
c  in DIMACS:
 1934  1935 -1936 -258 -1937 0
 1934  1935 -1936 -258  1938 0
 1934  1935 -1936 -258 -1939 0

c  2+1 --> break 
c    (-b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧  p_258) -> break
c  in CNF:
c     b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 1934 -1935  1936 -258 1162 0


c  2-1 --> 1
c    (-b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧ -p_258) -> (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0)
c  in CNF:
c     b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_2
c     b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_1
c     b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨  b^{1, 259}_0
c  in DIMACS:
 1934 -1935  1936  258 -1937 0
 1934 -1935  1936  258 -1938 0
 1934 -1935  1936  258  1939 0

c  1-1 --> 0
c    (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0 ∧ -p_258) -> (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧ -b^{1, 259}_0)
c  in CNF:
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_2
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_1
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_0
c  in DIMACS:
 1934  1935 -1936  258 -1937 0
 1934  1935 -1936  258 -1938 0
 1934  1935 -1936  258 -1939 0

c  0-1 --> -1
c    (-b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧ -p_258) -> ( b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0)
c  in CNF:
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨  b^{1, 259}_2
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_1
c     b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨  b^{1, 259}_0
c  in DIMACS:
 1934  1935  1936  258  1937 0
 1934  1935  1936  258 -1938 0
 1934  1935  1936  258  1939 0

c  -1-1 --> -2
c    ( b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧  b^{1, 258}_0 ∧ -p_258) -> ( b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0)
c  in CNF:
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨  b^{1, 259}_2
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨  b^{1, 259}_1
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨  p_258 ∨ -b^{1, 259}_0
c  in DIMACS:
-1934  1935 -1936  258  1937 0
-1934  1935 -1936  258  1938 0
-1934  1935 -1936  258 -1939 0

c  -2-1 --> break 
c    ( b^{1, 258}_2 ∧  b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨  b^{1, 258}_0 ∨  p_258 ∨ break
c  in DIMACS:
-1934 -1935  1936  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 258}_2 ∧ -b^{1, 258}_1 ∧ -b^{1, 258}_0 ∧ true) 
c  in CNF:
c    -b^{1, 258}_2 ∨  b^{1, 258}_1 ∨  b^{1, 258}_0 ∨ false 
c  in DIMACS:
-1934  1935  1936  0

c  3 does not represent an automaton state.
c    -(-b^{1, 258}_2 ∧  b^{1, 258}_1 ∧  b^{1, 258}_0 ∧ true) 
c  in CNF:
c     b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ false 
c  in DIMACS:
 1934 -1935 -1936  0
c  -3 does not represent an automaton state.
c    -( b^{1, 258}_2 ∧  b^{1, 258}_1 ∧  b^{1, 258}_0 ∧ true) 
c  in CNF:
c    -b^{1, 258}_2 ∨ -b^{1, 258}_1 ∨ -b^{1, 258}_0 ∨ false 
c  in DIMACS:
-1934 -1935 -1936  0

c i = 259
c  -2+1 --> -1
c    ( b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧  p_259) -> ( b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0)
c  in CNF:
c    -b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨  b^{1, 260}_2
c    -b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_1
c    -b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨  b^{1, 260}_0
c  in DIMACS:
-1937 -1938  1939 -259  1940 0
-1937 -1938  1939 -259 -1941 0
-1937 -1938  1939 -259  1942 0

c  -1+1 --> 0
c    ( b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0 ∧  p_259) -> (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧ -b^{1, 260}_0)
c  in CNF:
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_2
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_1
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_0
c  in DIMACS:
-1937  1938 -1939 -259 -1940 0
-1937  1938 -1939 -259 -1941 0
-1937  1938 -1939 -259 -1942 0

c  0+1 --> 1
c    (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧  p_259) -> (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0)
c  in CNF:
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_2
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_1
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨  b^{1, 260}_0
c  in DIMACS:
 1937  1938  1939 -259 -1940 0
 1937  1938  1939 -259 -1941 0
 1937  1938  1939 -259  1942 0

c  1+1 --> 2
c    (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0 ∧  p_259) -> (-b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0)
c  in CNF:
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_2
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨  b^{1, 260}_1
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ -p_259 ∨ -b^{1, 260}_0
c  in DIMACS:
 1937  1938 -1939 -259 -1940 0
 1937  1938 -1939 -259  1941 0
 1937  1938 -1939 -259 -1942 0

c  2+1 --> break 
c    (-b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧  p_259) -> break
c  in CNF:
c     b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ -p_259 ∨ break
c  in DIMACS:
 1937 -1938  1939 -259 1162 0


c  2-1 --> 1
c    (-b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧ -p_259) -> (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0)
c  in CNF:
c     b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_2
c     b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_1
c     b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨  b^{1, 260}_0
c  in DIMACS:
 1937 -1938  1939  259 -1940 0
 1937 -1938  1939  259 -1941 0
 1937 -1938  1939  259  1942 0

c  1-1 --> 0
c    (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0 ∧ -p_259) -> (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧ -b^{1, 260}_0)
c  in CNF:
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_2
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_1
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_0
c  in DIMACS:
 1937  1938 -1939  259 -1940 0
 1937  1938 -1939  259 -1941 0
 1937  1938 -1939  259 -1942 0

c  0-1 --> -1
c    (-b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧ -p_259) -> ( b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0)
c  in CNF:
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨  b^{1, 260}_2
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_1
c     b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨  b^{1, 260}_0
c  in DIMACS:
 1937  1938  1939  259  1940 0
 1937  1938  1939  259 -1941 0
 1937  1938  1939  259  1942 0

c  -1-1 --> -2
c    ( b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧  b^{1, 259}_0 ∧ -p_259) -> ( b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0)
c  in CNF:
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨  b^{1, 260}_2
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨  b^{1, 260}_1
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨  p_259 ∨ -b^{1, 260}_0
c  in DIMACS:
-1937  1938 -1939  259  1940 0
-1937  1938 -1939  259  1941 0
-1937  1938 -1939  259 -1942 0

c  -2-1 --> break 
c    ( b^{1, 259}_2 ∧  b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧ -p_259) -> break
c  in CNF:
c    -b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨  b^{1, 259}_0 ∨  p_259 ∨ break
c  in DIMACS:
-1937 -1938  1939  259 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 259}_2 ∧ -b^{1, 259}_1 ∧ -b^{1, 259}_0 ∧ true) 
c  in CNF:
c    -b^{1, 259}_2 ∨  b^{1, 259}_1 ∨  b^{1, 259}_0 ∨ false 
c  in DIMACS:
-1937  1938  1939  0

c  3 does not represent an automaton state.
c    -(-b^{1, 259}_2 ∧  b^{1, 259}_1 ∧  b^{1, 259}_0 ∧ true) 
c  in CNF:
c     b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ false 
c  in DIMACS:
 1937 -1938 -1939  0
c  -3 does not represent an automaton state.
c    -( b^{1, 259}_2 ∧  b^{1, 259}_1 ∧  b^{1, 259}_0 ∧ true) 
c  in CNF:
c    -b^{1, 259}_2 ∨ -b^{1, 259}_1 ∨ -b^{1, 259}_0 ∨ false 
c  in DIMACS:
-1937 -1938 -1939  0

c i = 260
c  -2+1 --> -1
c    ( b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧  p_260) -> ( b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0)
c  in CNF:
c    -b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨  b^{1, 261}_2
c    -b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_1
c    -b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨  b^{1, 261}_0
c  in DIMACS:
-1940 -1941  1942 -260  1943 0
-1940 -1941  1942 -260 -1944 0
-1940 -1941  1942 -260  1945 0

c  -1+1 --> 0
c    ( b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0 ∧  p_260) -> (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧ -b^{1, 261}_0)
c  in CNF:
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_2
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_1
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_0
c  in DIMACS:
-1940  1941 -1942 -260 -1943 0
-1940  1941 -1942 -260 -1944 0
-1940  1941 -1942 -260 -1945 0

c  0+1 --> 1
c    (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧  p_260) -> (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0)
c  in CNF:
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_2
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_1
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨  b^{1, 261}_0
c  in DIMACS:
 1940  1941  1942 -260 -1943 0
 1940  1941  1942 -260 -1944 0
 1940  1941  1942 -260  1945 0

c  1+1 --> 2
c    (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0 ∧  p_260) -> (-b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0)
c  in CNF:
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_2
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨  b^{1, 261}_1
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ -p_260 ∨ -b^{1, 261}_0
c  in DIMACS:
 1940  1941 -1942 -260 -1943 0
 1940  1941 -1942 -260  1944 0
 1940  1941 -1942 -260 -1945 0

c  2+1 --> break 
c    (-b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧  p_260) -> break
c  in CNF:
c     b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 1940 -1941  1942 -260 1162 0


c  2-1 --> 1
c    (-b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧ -p_260) -> (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0)
c  in CNF:
c     b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_2
c     b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_1
c     b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨  b^{1, 261}_0
c  in DIMACS:
 1940 -1941  1942  260 -1943 0
 1940 -1941  1942  260 -1944 0
 1940 -1941  1942  260  1945 0

c  1-1 --> 0
c    (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0 ∧ -p_260) -> (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧ -b^{1, 261}_0)
c  in CNF:
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_2
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_1
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_0
c  in DIMACS:
 1940  1941 -1942  260 -1943 0
 1940  1941 -1942  260 -1944 0
 1940  1941 -1942  260 -1945 0

c  0-1 --> -1
c    (-b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧ -p_260) -> ( b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0)
c  in CNF:
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨  b^{1, 261}_2
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_1
c     b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨  b^{1, 261}_0
c  in DIMACS:
 1940  1941  1942  260  1943 0
 1940  1941  1942  260 -1944 0
 1940  1941  1942  260  1945 0

c  -1-1 --> -2
c    ( b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧  b^{1, 260}_0 ∧ -p_260) -> ( b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0)
c  in CNF:
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨  b^{1, 261}_2
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨  b^{1, 261}_1
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨  p_260 ∨ -b^{1, 261}_0
c  in DIMACS:
-1940  1941 -1942  260  1943 0
-1940  1941 -1942  260  1944 0
-1940  1941 -1942  260 -1945 0

c  -2-1 --> break 
c    ( b^{1, 260}_2 ∧  b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨  b^{1, 260}_0 ∨  p_260 ∨ break
c  in DIMACS:
-1940 -1941  1942  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 260}_2 ∧ -b^{1, 260}_1 ∧ -b^{1, 260}_0 ∧ true) 
c  in CNF:
c    -b^{1, 260}_2 ∨  b^{1, 260}_1 ∨  b^{1, 260}_0 ∨ false 
c  in DIMACS:
-1940  1941  1942  0

c  3 does not represent an automaton state.
c    -(-b^{1, 260}_2 ∧  b^{1, 260}_1 ∧  b^{1, 260}_0 ∧ true) 
c  in CNF:
c     b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ false 
c  in DIMACS:
 1940 -1941 -1942  0
c  -3 does not represent an automaton state.
c    -( b^{1, 260}_2 ∧  b^{1, 260}_1 ∧  b^{1, 260}_0 ∧ true) 
c  in CNF:
c    -b^{1, 260}_2 ∨ -b^{1, 260}_1 ∨ -b^{1, 260}_0 ∨ false 
c  in DIMACS:
-1940 -1941 -1942  0

c i = 261
c  -2+1 --> -1
c    ( b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧  p_261) -> ( b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0)
c  in CNF:
c    -b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨  b^{1, 262}_2
c    -b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_1
c    -b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨  b^{1, 262}_0
c  in DIMACS:
-1943 -1944  1945 -261  1946 0
-1943 -1944  1945 -261 -1947 0
-1943 -1944  1945 -261  1948 0

c  -1+1 --> 0
c    ( b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0 ∧  p_261) -> (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧ -b^{1, 262}_0)
c  in CNF:
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_2
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_1
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_0
c  in DIMACS:
-1943  1944 -1945 -261 -1946 0
-1943  1944 -1945 -261 -1947 0
-1943  1944 -1945 -261 -1948 0

c  0+1 --> 1
c    (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧  p_261) -> (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0)
c  in CNF:
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_2
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_1
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨  b^{1, 262}_0
c  in DIMACS:
 1943  1944  1945 -261 -1946 0
 1943  1944  1945 -261 -1947 0
 1943  1944  1945 -261  1948 0

c  1+1 --> 2
c    (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0 ∧  p_261) -> (-b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0)
c  in CNF:
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_2
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨  b^{1, 262}_1
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ -p_261 ∨ -b^{1, 262}_0
c  in DIMACS:
 1943  1944 -1945 -261 -1946 0
 1943  1944 -1945 -261  1947 0
 1943  1944 -1945 -261 -1948 0

c  2+1 --> break 
c    (-b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧  p_261) -> break
c  in CNF:
c     b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 1943 -1944  1945 -261 1162 0


c  2-1 --> 1
c    (-b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧ -p_261) -> (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0)
c  in CNF:
c     b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_2
c     b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_1
c     b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨  b^{1, 262}_0
c  in DIMACS:
 1943 -1944  1945  261 -1946 0
 1943 -1944  1945  261 -1947 0
 1943 -1944  1945  261  1948 0

c  1-1 --> 0
c    (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0 ∧ -p_261) -> (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧ -b^{1, 262}_0)
c  in CNF:
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_2
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_1
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_0
c  in DIMACS:
 1943  1944 -1945  261 -1946 0
 1943  1944 -1945  261 -1947 0
 1943  1944 -1945  261 -1948 0

c  0-1 --> -1
c    (-b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧ -p_261) -> ( b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0)
c  in CNF:
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨  b^{1, 262}_2
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_1
c     b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨  b^{1, 262}_0
c  in DIMACS:
 1943  1944  1945  261  1946 0
 1943  1944  1945  261 -1947 0
 1943  1944  1945  261  1948 0

c  -1-1 --> -2
c    ( b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧  b^{1, 261}_0 ∧ -p_261) -> ( b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0)
c  in CNF:
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨  b^{1, 262}_2
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨  b^{1, 262}_1
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨  p_261 ∨ -b^{1, 262}_0
c  in DIMACS:
-1943  1944 -1945  261  1946 0
-1943  1944 -1945  261  1947 0
-1943  1944 -1945  261 -1948 0

c  -2-1 --> break 
c    ( b^{1, 261}_2 ∧  b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨  b^{1, 261}_0 ∨  p_261 ∨ break
c  in DIMACS:
-1943 -1944  1945  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 261}_2 ∧ -b^{1, 261}_1 ∧ -b^{1, 261}_0 ∧ true) 
c  in CNF:
c    -b^{1, 261}_2 ∨  b^{1, 261}_1 ∨  b^{1, 261}_0 ∨ false 
c  in DIMACS:
-1943  1944  1945  0

c  3 does not represent an automaton state.
c    -(-b^{1, 261}_2 ∧  b^{1, 261}_1 ∧  b^{1, 261}_0 ∧ true) 
c  in CNF:
c     b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ false 
c  in DIMACS:
 1943 -1944 -1945  0
c  -3 does not represent an automaton state.
c    -( b^{1, 261}_2 ∧  b^{1, 261}_1 ∧  b^{1, 261}_0 ∧ true) 
c  in CNF:
c    -b^{1, 261}_2 ∨ -b^{1, 261}_1 ∨ -b^{1, 261}_0 ∨ false 
c  in DIMACS:
-1943 -1944 -1945  0

c i = 262
c  -2+1 --> -1
c    ( b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧  p_262) -> ( b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0)
c  in CNF:
c    -b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨  b^{1, 263}_2
c    -b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_1
c    -b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨  b^{1, 263}_0
c  in DIMACS:
-1946 -1947  1948 -262  1949 0
-1946 -1947  1948 -262 -1950 0
-1946 -1947  1948 -262  1951 0

c  -1+1 --> 0
c    ( b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0 ∧  p_262) -> (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧ -b^{1, 263}_0)
c  in CNF:
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_2
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_1
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_0
c  in DIMACS:
-1946  1947 -1948 -262 -1949 0
-1946  1947 -1948 -262 -1950 0
-1946  1947 -1948 -262 -1951 0

c  0+1 --> 1
c    (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧  p_262) -> (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0)
c  in CNF:
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_2
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_1
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨  b^{1, 263}_0
c  in DIMACS:
 1946  1947  1948 -262 -1949 0
 1946  1947  1948 -262 -1950 0
 1946  1947  1948 -262  1951 0

c  1+1 --> 2
c    (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0 ∧  p_262) -> (-b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0)
c  in CNF:
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_2
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨  b^{1, 263}_1
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ -p_262 ∨ -b^{1, 263}_0
c  in DIMACS:
 1946  1947 -1948 -262 -1949 0
 1946  1947 -1948 -262  1950 0
 1946  1947 -1948 -262 -1951 0

c  2+1 --> break 
c    (-b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧  p_262) -> break
c  in CNF:
c     b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ -p_262 ∨ break
c  in DIMACS:
 1946 -1947  1948 -262 1162 0


c  2-1 --> 1
c    (-b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧ -p_262) -> (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0)
c  in CNF:
c     b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_2
c     b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_1
c     b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨  b^{1, 263}_0
c  in DIMACS:
 1946 -1947  1948  262 -1949 0
 1946 -1947  1948  262 -1950 0
 1946 -1947  1948  262  1951 0

c  1-1 --> 0
c    (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0 ∧ -p_262) -> (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧ -b^{1, 263}_0)
c  in CNF:
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_2
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_1
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_0
c  in DIMACS:
 1946  1947 -1948  262 -1949 0
 1946  1947 -1948  262 -1950 0
 1946  1947 -1948  262 -1951 0

c  0-1 --> -1
c    (-b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧ -p_262) -> ( b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0)
c  in CNF:
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨  b^{1, 263}_2
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_1
c     b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨  b^{1, 263}_0
c  in DIMACS:
 1946  1947  1948  262  1949 0
 1946  1947  1948  262 -1950 0
 1946  1947  1948  262  1951 0

c  -1-1 --> -2
c    ( b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧  b^{1, 262}_0 ∧ -p_262) -> ( b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0)
c  in CNF:
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨  b^{1, 263}_2
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨  b^{1, 263}_1
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨  p_262 ∨ -b^{1, 263}_0
c  in DIMACS:
-1946  1947 -1948  262  1949 0
-1946  1947 -1948  262  1950 0
-1946  1947 -1948  262 -1951 0

c  -2-1 --> break 
c    ( b^{1, 262}_2 ∧  b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧ -p_262) -> break
c  in CNF:
c    -b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨  b^{1, 262}_0 ∨  p_262 ∨ break
c  in DIMACS:
-1946 -1947  1948  262 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 262}_2 ∧ -b^{1, 262}_1 ∧ -b^{1, 262}_0 ∧ true) 
c  in CNF:
c    -b^{1, 262}_2 ∨  b^{1, 262}_1 ∨  b^{1, 262}_0 ∨ false 
c  in DIMACS:
-1946  1947  1948  0

c  3 does not represent an automaton state.
c    -(-b^{1, 262}_2 ∧  b^{1, 262}_1 ∧  b^{1, 262}_0 ∧ true) 
c  in CNF:
c     b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ false 
c  in DIMACS:
 1946 -1947 -1948  0
c  -3 does not represent an automaton state.
c    -( b^{1, 262}_2 ∧  b^{1, 262}_1 ∧  b^{1, 262}_0 ∧ true) 
c  in CNF:
c    -b^{1, 262}_2 ∨ -b^{1, 262}_1 ∨ -b^{1, 262}_0 ∨ false 
c  in DIMACS:
-1946 -1947 -1948  0

c i = 263
c  -2+1 --> -1
c    ( b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧  p_263) -> ( b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0)
c  in CNF:
c    -b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨  b^{1, 264}_2
c    -b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_1
c    -b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨  b^{1, 264}_0
c  in DIMACS:
-1949 -1950  1951 -263  1952 0
-1949 -1950  1951 -263 -1953 0
-1949 -1950  1951 -263  1954 0

c  -1+1 --> 0
c    ( b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0 ∧  p_263) -> (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧ -b^{1, 264}_0)
c  in CNF:
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_2
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_1
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_0
c  in DIMACS:
-1949  1950 -1951 -263 -1952 0
-1949  1950 -1951 -263 -1953 0
-1949  1950 -1951 -263 -1954 0

c  0+1 --> 1
c    (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧  p_263) -> (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0)
c  in CNF:
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_2
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_1
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨  b^{1, 264}_0
c  in DIMACS:
 1949  1950  1951 -263 -1952 0
 1949  1950  1951 -263 -1953 0
 1949  1950  1951 -263  1954 0

c  1+1 --> 2
c    (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0 ∧  p_263) -> (-b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0)
c  in CNF:
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_2
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨  b^{1, 264}_1
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ -p_263 ∨ -b^{1, 264}_0
c  in DIMACS:
 1949  1950 -1951 -263 -1952 0
 1949  1950 -1951 -263  1953 0
 1949  1950 -1951 -263 -1954 0

c  2+1 --> break 
c    (-b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧  p_263) -> break
c  in CNF:
c     b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ -p_263 ∨ break
c  in DIMACS:
 1949 -1950  1951 -263 1162 0


c  2-1 --> 1
c    (-b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧ -p_263) -> (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0)
c  in CNF:
c     b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_2
c     b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_1
c     b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨  b^{1, 264}_0
c  in DIMACS:
 1949 -1950  1951  263 -1952 0
 1949 -1950  1951  263 -1953 0
 1949 -1950  1951  263  1954 0

c  1-1 --> 0
c    (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0 ∧ -p_263) -> (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧ -b^{1, 264}_0)
c  in CNF:
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_2
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_1
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_0
c  in DIMACS:
 1949  1950 -1951  263 -1952 0
 1949  1950 -1951  263 -1953 0
 1949  1950 -1951  263 -1954 0

c  0-1 --> -1
c    (-b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧ -p_263) -> ( b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0)
c  in CNF:
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨  b^{1, 264}_2
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_1
c     b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨  b^{1, 264}_0
c  in DIMACS:
 1949  1950  1951  263  1952 0
 1949  1950  1951  263 -1953 0
 1949  1950  1951  263  1954 0

c  -1-1 --> -2
c    ( b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧  b^{1, 263}_0 ∧ -p_263) -> ( b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0)
c  in CNF:
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨  b^{1, 264}_2
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨  b^{1, 264}_1
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨  p_263 ∨ -b^{1, 264}_0
c  in DIMACS:
-1949  1950 -1951  263  1952 0
-1949  1950 -1951  263  1953 0
-1949  1950 -1951  263 -1954 0

c  -2-1 --> break 
c    ( b^{1, 263}_2 ∧  b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧ -p_263) -> break
c  in CNF:
c    -b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨  b^{1, 263}_0 ∨  p_263 ∨ break
c  in DIMACS:
-1949 -1950  1951  263 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 263}_2 ∧ -b^{1, 263}_1 ∧ -b^{1, 263}_0 ∧ true) 
c  in CNF:
c    -b^{1, 263}_2 ∨  b^{1, 263}_1 ∨  b^{1, 263}_0 ∨ false 
c  in DIMACS:
-1949  1950  1951  0

c  3 does not represent an automaton state.
c    -(-b^{1, 263}_2 ∧  b^{1, 263}_1 ∧  b^{1, 263}_0 ∧ true) 
c  in CNF:
c     b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ false 
c  in DIMACS:
 1949 -1950 -1951  0
c  -3 does not represent an automaton state.
c    -( b^{1, 263}_2 ∧  b^{1, 263}_1 ∧  b^{1, 263}_0 ∧ true) 
c  in CNF:
c    -b^{1, 263}_2 ∨ -b^{1, 263}_1 ∨ -b^{1, 263}_0 ∨ false 
c  in DIMACS:
-1949 -1950 -1951  0

c i = 264
c  -2+1 --> -1
c    ( b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧  p_264) -> ( b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0)
c  in CNF:
c    -b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨  b^{1, 265}_2
c    -b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_1
c    -b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨  b^{1, 265}_0
c  in DIMACS:
-1952 -1953  1954 -264  1955 0
-1952 -1953  1954 -264 -1956 0
-1952 -1953  1954 -264  1957 0

c  -1+1 --> 0
c    ( b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0 ∧  p_264) -> (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧ -b^{1, 265}_0)
c  in CNF:
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_2
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_1
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_0
c  in DIMACS:
-1952  1953 -1954 -264 -1955 0
-1952  1953 -1954 -264 -1956 0
-1952  1953 -1954 -264 -1957 0

c  0+1 --> 1
c    (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧  p_264) -> (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0)
c  in CNF:
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_2
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_1
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨  b^{1, 265}_0
c  in DIMACS:
 1952  1953  1954 -264 -1955 0
 1952  1953  1954 -264 -1956 0
 1952  1953  1954 -264  1957 0

c  1+1 --> 2
c    (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0 ∧  p_264) -> (-b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0)
c  in CNF:
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_2
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨  b^{1, 265}_1
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ -p_264 ∨ -b^{1, 265}_0
c  in DIMACS:
 1952  1953 -1954 -264 -1955 0
 1952  1953 -1954 -264  1956 0
 1952  1953 -1954 -264 -1957 0

c  2+1 --> break 
c    (-b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧  p_264) -> break
c  in CNF:
c     b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 1952 -1953  1954 -264 1162 0


c  2-1 --> 1
c    (-b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧ -p_264) -> (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0)
c  in CNF:
c     b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_2
c     b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_1
c     b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨  b^{1, 265}_0
c  in DIMACS:
 1952 -1953  1954  264 -1955 0
 1952 -1953  1954  264 -1956 0
 1952 -1953  1954  264  1957 0

c  1-1 --> 0
c    (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0 ∧ -p_264) -> (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧ -b^{1, 265}_0)
c  in CNF:
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_2
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_1
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_0
c  in DIMACS:
 1952  1953 -1954  264 -1955 0
 1952  1953 -1954  264 -1956 0
 1952  1953 -1954  264 -1957 0

c  0-1 --> -1
c    (-b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧ -p_264) -> ( b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0)
c  in CNF:
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨  b^{1, 265}_2
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_1
c     b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨  b^{1, 265}_0
c  in DIMACS:
 1952  1953  1954  264  1955 0
 1952  1953  1954  264 -1956 0
 1952  1953  1954  264  1957 0

c  -1-1 --> -2
c    ( b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧  b^{1, 264}_0 ∧ -p_264) -> ( b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0)
c  in CNF:
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨  b^{1, 265}_2
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨  b^{1, 265}_1
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨  p_264 ∨ -b^{1, 265}_0
c  in DIMACS:
-1952  1953 -1954  264  1955 0
-1952  1953 -1954  264  1956 0
-1952  1953 -1954  264 -1957 0

c  -2-1 --> break 
c    ( b^{1, 264}_2 ∧  b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨  b^{1, 264}_0 ∨  p_264 ∨ break
c  in DIMACS:
-1952 -1953  1954  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 264}_2 ∧ -b^{1, 264}_1 ∧ -b^{1, 264}_0 ∧ true) 
c  in CNF:
c    -b^{1, 264}_2 ∨  b^{1, 264}_1 ∨  b^{1, 264}_0 ∨ false 
c  in DIMACS:
-1952  1953  1954  0

c  3 does not represent an automaton state.
c    -(-b^{1, 264}_2 ∧  b^{1, 264}_1 ∧  b^{1, 264}_0 ∧ true) 
c  in CNF:
c     b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ false 
c  in DIMACS:
 1952 -1953 -1954  0
c  -3 does not represent an automaton state.
c    -( b^{1, 264}_2 ∧  b^{1, 264}_1 ∧  b^{1, 264}_0 ∧ true) 
c  in CNF:
c    -b^{1, 264}_2 ∨ -b^{1, 264}_1 ∨ -b^{1, 264}_0 ∨ false 
c  in DIMACS:
-1952 -1953 -1954  0

c i = 265
c  -2+1 --> -1
c    ( b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧  p_265) -> ( b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0)
c  in CNF:
c    -b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨  b^{1, 266}_2
c    -b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_1
c    -b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨  b^{1, 266}_0
c  in DIMACS:
-1955 -1956  1957 -265  1958 0
-1955 -1956  1957 -265 -1959 0
-1955 -1956  1957 -265  1960 0

c  -1+1 --> 0
c    ( b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0 ∧  p_265) -> (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧ -b^{1, 266}_0)
c  in CNF:
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_2
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_1
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_0
c  in DIMACS:
-1955  1956 -1957 -265 -1958 0
-1955  1956 -1957 -265 -1959 0
-1955  1956 -1957 -265 -1960 0

c  0+1 --> 1
c    (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧  p_265) -> (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0)
c  in CNF:
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_2
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_1
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨  b^{1, 266}_0
c  in DIMACS:
 1955  1956  1957 -265 -1958 0
 1955  1956  1957 -265 -1959 0
 1955  1956  1957 -265  1960 0

c  1+1 --> 2
c    (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0 ∧  p_265) -> (-b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0)
c  in CNF:
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_2
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨  b^{1, 266}_1
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ -p_265 ∨ -b^{1, 266}_0
c  in DIMACS:
 1955  1956 -1957 -265 -1958 0
 1955  1956 -1957 -265  1959 0
 1955  1956 -1957 -265 -1960 0

c  2+1 --> break 
c    (-b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧  p_265) -> break
c  in CNF:
c     b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ -p_265 ∨ break
c  in DIMACS:
 1955 -1956  1957 -265 1162 0


c  2-1 --> 1
c    (-b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧ -p_265) -> (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0)
c  in CNF:
c     b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_2
c     b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_1
c     b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨  b^{1, 266}_0
c  in DIMACS:
 1955 -1956  1957  265 -1958 0
 1955 -1956  1957  265 -1959 0
 1955 -1956  1957  265  1960 0

c  1-1 --> 0
c    (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0 ∧ -p_265) -> (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧ -b^{1, 266}_0)
c  in CNF:
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_2
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_1
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_0
c  in DIMACS:
 1955  1956 -1957  265 -1958 0
 1955  1956 -1957  265 -1959 0
 1955  1956 -1957  265 -1960 0

c  0-1 --> -1
c    (-b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧ -p_265) -> ( b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0)
c  in CNF:
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨  b^{1, 266}_2
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_1
c     b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨  b^{1, 266}_0
c  in DIMACS:
 1955  1956  1957  265  1958 0
 1955  1956  1957  265 -1959 0
 1955  1956  1957  265  1960 0

c  -1-1 --> -2
c    ( b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧  b^{1, 265}_0 ∧ -p_265) -> ( b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0)
c  in CNF:
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨  b^{1, 266}_2
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨  b^{1, 266}_1
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨  p_265 ∨ -b^{1, 266}_0
c  in DIMACS:
-1955  1956 -1957  265  1958 0
-1955  1956 -1957  265  1959 0
-1955  1956 -1957  265 -1960 0

c  -2-1 --> break 
c    ( b^{1, 265}_2 ∧  b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧ -p_265) -> break
c  in CNF:
c    -b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨  b^{1, 265}_0 ∨  p_265 ∨ break
c  in DIMACS:
-1955 -1956  1957  265 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 265}_2 ∧ -b^{1, 265}_1 ∧ -b^{1, 265}_0 ∧ true) 
c  in CNF:
c    -b^{1, 265}_2 ∨  b^{1, 265}_1 ∨  b^{1, 265}_0 ∨ false 
c  in DIMACS:
-1955  1956  1957  0

c  3 does not represent an automaton state.
c    -(-b^{1, 265}_2 ∧  b^{1, 265}_1 ∧  b^{1, 265}_0 ∧ true) 
c  in CNF:
c     b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ false 
c  in DIMACS:
 1955 -1956 -1957  0
c  -3 does not represent an automaton state.
c    -( b^{1, 265}_2 ∧  b^{1, 265}_1 ∧  b^{1, 265}_0 ∧ true) 
c  in CNF:
c    -b^{1, 265}_2 ∨ -b^{1, 265}_1 ∨ -b^{1, 265}_0 ∨ false 
c  in DIMACS:
-1955 -1956 -1957  0

c i = 266
c  -2+1 --> -1
c    ( b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧  p_266) -> ( b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0)
c  in CNF:
c    -b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨  b^{1, 267}_2
c    -b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_1
c    -b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨  b^{1, 267}_0
c  in DIMACS:
-1958 -1959  1960 -266  1961 0
-1958 -1959  1960 -266 -1962 0
-1958 -1959  1960 -266  1963 0

c  -1+1 --> 0
c    ( b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0 ∧  p_266) -> (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧ -b^{1, 267}_0)
c  in CNF:
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_2
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_1
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_0
c  in DIMACS:
-1958  1959 -1960 -266 -1961 0
-1958  1959 -1960 -266 -1962 0
-1958  1959 -1960 -266 -1963 0

c  0+1 --> 1
c    (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧  p_266) -> (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0)
c  in CNF:
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_2
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_1
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨  b^{1, 267}_0
c  in DIMACS:
 1958  1959  1960 -266 -1961 0
 1958  1959  1960 -266 -1962 0
 1958  1959  1960 -266  1963 0

c  1+1 --> 2
c    (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0 ∧  p_266) -> (-b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0)
c  in CNF:
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_2
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨  b^{1, 267}_1
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ -p_266 ∨ -b^{1, 267}_0
c  in DIMACS:
 1958  1959 -1960 -266 -1961 0
 1958  1959 -1960 -266  1962 0
 1958  1959 -1960 -266 -1963 0

c  2+1 --> break 
c    (-b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧  p_266) -> break
c  in CNF:
c     b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 1958 -1959  1960 -266 1162 0


c  2-1 --> 1
c    (-b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧ -p_266) -> (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0)
c  in CNF:
c     b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_2
c     b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_1
c     b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨  b^{1, 267}_0
c  in DIMACS:
 1958 -1959  1960  266 -1961 0
 1958 -1959  1960  266 -1962 0
 1958 -1959  1960  266  1963 0

c  1-1 --> 0
c    (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0 ∧ -p_266) -> (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧ -b^{1, 267}_0)
c  in CNF:
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_2
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_1
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_0
c  in DIMACS:
 1958  1959 -1960  266 -1961 0
 1958  1959 -1960  266 -1962 0
 1958  1959 -1960  266 -1963 0

c  0-1 --> -1
c    (-b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧ -p_266) -> ( b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0)
c  in CNF:
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨  b^{1, 267}_2
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_1
c     b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨  b^{1, 267}_0
c  in DIMACS:
 1958  1959  1960  266  1961 0
 1958  1959  1960  266 -1962 0
 1958  1959  1960  266  1963 0

c  -1-1 --> -2
c    ( b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧  b^{1, 266}_0 ∧ -p_266) -> ( b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0)
c  in CNF:
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨  b^{1, 267}_2
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨  b^{1, 267}_1
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨  p_266 ∨ -b^{1, 267}_0
c  in DIMACS:
-1958  1959 -1960  266  1961 0
-1958  1959 -1960  266  1962 0
-1958  1959 -1960  266 -1963 0

c  -2-1 --> break 
c    ( b^{1, 266}_2 ∧  b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨  b^{1, 266}_0 ∨  p_266 ∨ break
c  in DIMACS:
-1958 -1959  1960  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 266}_2 ∧ -b^{1, 266}_1 ∧ -b^{1, 266}_0 ∧ true) 
c  in CNF:
c    -b^{1, 266}_2 ∨  b^{1, 266}_1 ∨  b^{1, 266}_0 ∨ false 
c  in DIMACS:
-1958  1959  1960  0

c  3 does not represent an automaton state.
c    -(-b^{1, 266}_2 ∧  b^{1, 266}_1 ∧  b^{1, 266}_0 ∧ true) 
c  in CNF:
c     b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ false 
c  in DIMACS:
 1958 -1959 -1960  0
c  -3 does not represent an automaton state.
c    -( b^{1, 266}_2 ∧  b^{1, 266}_1 ∧  b^{1, 266}_0 ∧ true) 
c  in CNF:
c    -b^{1, 266}_2 ∨ -b^{1, 266}_1 ∨ -b^{1, 266}_0 ∨ false 
c  in DIMACS:
-1958 -1959 -1960  0

c i = 267
c  -2+1 --> -1
c    ( b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧  p_267) -> ( b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0)
c  in CNF:
c    -b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨  b^{1, 268}_2
c    -b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_1
c    -b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨  b^{1, 268}_0
c  in DIMACS:
-1961 -1962  1963 -267  1964 0
-1961 -1962  1963 -267 -1965 0
-1961 -1962  1963 -267  1966 0

c  -1+1 --> 0
c    ( b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0 ∧  p_267) -> (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧ -b^{1, 268}_0)
c  in CNF:
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_2
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_1
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_0
c  in DIMACS:
-1961  1962 -1963 -267 -1964 0
-1961  1962 -1963 -267 -1965 0
-1961  1962 -1963 -267 -1966 0

c  0+1 --> 1
c    (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧  p_267) -> (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0)
c  in CNF:
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_2
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_1
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨  b^{1, 268}_0
c  in DIMACS:
 1961  1962  1963 -267 -1964 0
 1961  1962  1963 -267 -1965 0
 1961  1962  1963 -267  1966 0

c  1+1 --> 2
c    (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0 ∧  p_267) -> (-b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0)
c  in CNF:
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_2
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨  b^{1, 268}_1
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ -p_267 ∨ -b^{1, 268}_0
c  in DIMACS:
 1961  1962 -1963 -267 -1964 0
 1961  1962 -1963 -267  1965 0
 1961  1962 -1963 -267 -1966 0

c  2+1 --> break 
c    (-b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧  p_267) -> break
c  in CNF:
c     b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ -p_267 ∨ break
c  in DIMACS:
 1961 -1962  1963 -267 1162 0


c  2-1 --> 1
c    (-b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧ -p_267) -> (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0)
c  in CNF:
c     b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_2
c     b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_1
c     b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨  b^{1, 268}_0
c  in DIMACS:
 1961 -1962  1963  267 -1964 0
 1961 -1962  1963  267 -1965 0
 1961 -1962  1963  267  1966 0

c  1-1 --> 0
c    (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0 ∧ -p_267) -> (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧ -b^{1, 268}_0)
c  in CNF:
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_2
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_1
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_0
c  in DIMACS:
 1961  1962 -1963  267 -1964 0
 1961  1962 -1963  267 -1965 0
 1961  1962 -1963  267 -1966 0

c  0-1 --> -1
c    (-b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧ -p_267) -> ( b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0)
c  in CNF:
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨  b^{1, 268}_2
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_1
c     b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨  b^{1, 268}_0
c  in DIMACS:
 1961  1962  1963  267  1964 0
 1961  1962  1963  267 -1965 0
 1961  1962  1963  267  1966 0

c  -1-1 --> -2
c    ( b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧  b^{1, 267}_0 ∧ -p_267) -> ( b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0)
c  in CNF:
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨  b^{1, 268}_2
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨  b^{1, 268}_1
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨  p_267 ∨ -b^{1, 268}_0
c  in DIMACS:
-1961  1962 -1963  267  1964 0
-1961  1962 -1963  267  1965 0
-1961  1962 -1963  267 -1966 0

c  -2-1 --> break 
c    ( b^{1, 267}_2 ∧  b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧ -p_267) -> break
c  in CNF:
c    -b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨  b^{1, 267}_0 ∨  p_267 ∨ break
c  in DIMACS:
-1961 -1962  1963  267 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 267}_2 ∧ -b^{1, 267}_1 ∧ -b^{1, 267}_0 ∧ true) 
c  in CNF:
c    -b^{1, 267}_2 ∨  b^{1, 267}_1 ∨  b^{1, 267}_0 ∨ false 
c  in DIMACS:
-1961  1962  1963  0

c  3 does not represent an automaton state.
c    -(-b^{1, 267}_2 ∧  b^{1, 267}_1 ∧  b^{1, 267}_0 ∧ true) 
c  in CNF:
c     b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ false 
c  in DIMACS:
 1961 -1962 -1963  0
c  -3 does not represent an automaton state.
c    -( b^{1, 267}_2 ∧  b^{1, 267}_1 ∧  b^{1, 267}_0 ∧ true) 
c  in CNF:
c    -b^{1, 267}_2 ∨ -b^{1, 267}_1 ∨ -b^{1, 267}_0 ∨ false 
c  in DIMACS:
-1961 -1962 -1963  0

c i = 268
c  -2+1 --> -1
c    ( b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧  p_268) -> ( b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0)
c  in CNF:
c    -b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨  b^{1, 269}_2
c    -b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_1
c    -b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨  b^{1, 269}_0
c  in DIMACS:
-1964 -1965  1966 -268  1967 0
-1964 -1965  1966 -268 -1968 0
-1964 -1965  1966 -268  1969 0

c  -1+1 --> 0
c    ( b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0 ∧  p_268) -> (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧ -b^{1, 269}_0)
c  in CNF:
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_2
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_1
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_0
c  in DIMACS:
-1964  1965 -1966 -268 -1967 0
-1964  1965 -1966 -268 -1968 0
-1964  1965 -1966 -268 -1969 0

c  0+1 --> 1
c    (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧  p_268) -> (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0)
c  in CNF:
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_2
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_1
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨  b^{1, 269}_0
c  in DIMACS:
 1964  1965  1966 -268 -1967 0
 1964  1965  1966 -268 -1968 0
 1964  1965  1966 -268  1969 0

c  1+1 --> 2
c    (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0 ∧  p_268) -> (-b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0)
c  in CNF:
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_2
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨  b^{1, 269}_1
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ -p_268 ∨ -b^{1, 269}_0
c  in DIMACS:
 1964  1965 -1966 -268 -1967 0
 1964  1965 -1966 -268  1968 0
 1964  1965 -1966 -268 -1969 0

c  2+1 --> break 
c    (-b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧  p_268) -> break
c  in CNF:
c     b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 1964 -1965  1966 -268 1162 0


c  2-1 --> 1
c    (-b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧ -p_268) -> (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0)
c  in CNF:
c     b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_2
c     b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_1
c     b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨  b^{1, 269}_0
c  in DIMACS:
 1964 -1965  1966  268 -1967 0
 1964 -1965  1966  268 -1968 0
 1964 -1965  1966  268  1969 0

c  1-1 --> 0
c    (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0 ∧ -p_268) -> (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧ -b^{1, 269}_0)
c  in CNF:
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_2
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_1
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_0
c  in DIMACS:
 1964  1965 -1966  268 -1967 0
 1964  1965 -1966  268 -1968 0
 1964  1965 -1966  268 -1969 0

c  0-1 --> -1
c    (-b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧ -p_268) -> ( b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0)
c  in CNF:
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨  b^{1, 269}_2
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_1
c     b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨  b^{1, 269}_0
c  in DIMACS:
 1964  1965  1966  268  1967 0
 1964  1965  1966  268 -1968 0
 1964  1965  1966  268  1969 0

c  -1-1 --> -2
c    ( b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧  b^{1, 268}_0 ∧ -p_268) -> ( b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0)
c  in CNF:
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨  b^{1, 269}_2
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨  b^{1, 269}_1
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨  p_268 ∨ -b^{1, 269}_0
c  in DIMACS:
-1964  1965 -1966  268  1967 0
-1964  1965 -1966  268  1968 0
-1964  1965 -1966  268 -1969 0

c  -2-1 --> break 
c    ( b^{1, 268}_2 ∧  b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨  b^{1, 268}_0 ∨  p_268 ∨ break
c  in DIMACS:
-1964 -1965  1966  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 268}_2 ∧ -b^{1, 268}_1 ∧ -b^{1, 268}_0 ∧ true) 
c  in CNF:
c    -b^{1, 268}_2 ∨  b^{1, 268}_1 ∨  b^{1, 268}_0 ∨ false 
c  in DIMACS:
-1964  1965  1966  0

c  3 does not represent an automaton state.
c    -(-b^{1, 268}_2 ∧  b^{1, 268}_1 ∧  b^{1, 268}_0 ∧ true) 
c  in CNF:
c     b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ false 
c  in DIMACS:
 1964 -1965 -1966  0
c  -3 does not represent an automaton state.
c    -( b^{1, 268}_2 ∧  b^{1, 268}_1 ∧  b^{1, 268}_0 ∧ true) 
c  in CNF:
c    -b^{1, 268}_2 ∨ -b^{1, 268}_1 ∨ -b^{1, 268}_0 ∨ false 
c  in DIMACS:
-1964 -1965 -1966  0

c i = 269
c  -2+1 --> -1
c    ( b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧  p_269) -> ( b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0)
c  in CNF:
c    -b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨  b^{1, 270}_2
c    -b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_1
c    -b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨  b^{1, 270}_0
c  in DIMACS:
-1967 -1968  1969 -269  1970 0
-1967 -1968  1969 -269 -1971 0
-1967 -1968  1969 -269  1972 0

c  -1+1 --> 0
c    ( b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0 ∧  p_269) -> (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧ -b^{1, 270}_0)
c  in CNF:
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_2
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_1
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_0
c  in DIMACS:
-1967  1968 -1969 -269 -1970 0
-1967  1968 -1969 -269 -1971 0
-1967  1968 -1969 -269 -1972 0

c  0+1 --> 1
c    (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧  p_269) -> (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0)
c  in CNF:
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_2
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_1
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨  b^{1, 270}_0
c  in DIMACS:
 1967  1968  1969 -269 -1970 0
 1967  1968  1969 -269 -1971 0
 1967  1968  1969 -269  1972 0

c  1+1 --> 2
c    (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0 ∧  p_269) -> (-b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0)
c  in CNF:
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_2
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨  b^{1, 270}_1
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ -p_269 ∨ -b^{1, 270}_0
c  in DIMACS:
 1967  1968 -1969 -269 -1970 0
 1967  1968 -1969 -269  1971 0
 1967  1968 -1969 -269 -1972 0

c  2+1 --> break 
c    (-b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧  p_269) -> break
c  in CNF:
c     b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ -p_269 ∨ break
c  in DIMACS:
 1967 -1968  1969 -269 1162 0


c  2-1 --> 1
c    (-b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧ -p_269) -> (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0)
c  in CNF:
c     b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_2
c     b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_1
c     b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨  b^{1, 270}_0
c  in DIMACS:
 1967 -1968  1969  269 -1970 0
 1967 -1968  1969  269 -1971 0
 1967 -1968  1969  269  1972 0

c  1-1 --> 0
c    (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0 ∧ -p_269) -> (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧ -b^{1, 270}_0)
c  in CNF:
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_2
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_1
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_0
c  in DIMACS:
 1967  1968 -1969  269 -1970 0
 1967  1968 -1969  269 -1971 0
 1967  1968 -1969  269 -1972 0

c  0-1 --> -1
c    (-b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧ -p_269) -> ( b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0)
c  in CNF:
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨  b^{1, 270}_2
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_1
c     b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨  b^{1, 270}_0
c  in DIMACS:
 1967  1968  1969  269  1970 0
 1967  1968  1969  269 -1971 0
 1967  1968  1969  269  1972 0

c  -1-1 --> -2
c    ( b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧  b^{1, 269}_0 ∧ -p_269) -> ( b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0)
c  in CNF:
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨  b^{1, 270}_2
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨  b^{1, 270}_1
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨  p_269 ∨ -b^{1, 270}_0
c  in DIMACS:
-1967  1968 -1969  269  1970 0
-1967  1968 -1969  269  1971 0
-1967  1968 -1969  269 -1972 0

c  -2-1 --> break 
c    ( b^{1, 269}_2 ∧  b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧ -p_269) -> break
c  in CNF:
c    -b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨  b^{1, 269}_0 ∨  p_269 ∨ break
c  in DIMACS:
-1967 -1968  1969  269 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 269}_2 ∧ -b^{1, 269}_1 ∧ -b^{1, 269}_0 ∧ true) 
c  in CNF:
c    -b^{1, 269}_2 ∨  b^{1, 269}_1 ∨  b^{1, 269}_0 ∨ false 
c  in DIMACS:
-1967  1968  1969  0

c  3 does not represent an automaton state.
c    -(-b^{1, 269}_2 ∧  b^{1, 269}_1 ∧  b^{1, 269}_0 ∧ true) 
c  in CNF:
c     b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ false 
c  in DIMACS:
 1967 -1968 -1969  0
c  -3 does not represent an automaton state.
c    -( b^{1, 269}_2 ∧  b^{1, 269}_1 ∧  b^{1, 269}_0 ∧ true) 
c  in CNF:
c    -b^{1, 269}_2 ∨ -b^{1, 269}_1 ∨ -b^{1, 269}_0 ∨ false 
c  in DIMACS:
-1967 -1968 -1969  0

c i = 270
c  -2+1 --> -1
c    ( b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧  p_270) -> ( b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0)
c  in CNF:
c    -b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨  b^{1, 271}_2
c    -b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_1
c    -b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨  b^{1, 271}_0
c  in DIMACS:
-1970 -1971  1972 -270  1973 0
-1970 -1971  1972 -270 -1974 0
-1970 -1971  1972 -270  1975 0

c  -1+1 --> 0
c    ( b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0 ∧  p_270) -> (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧ -b^{1, 271}_0)
c  in CNF:
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_2
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_1
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_0
c  in DIMACS:
-1970  1971 -1972 -270 -1973 0
-1970  1971 -1972 -270 -1974 0
-1970  1971 -1972 -270 -1975 0

c  0+1 --> 1
c    (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧  p_270) -> (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0)
c  in CNF:
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_2
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_1
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨  b^{1, 271}_0
c  in DIMACS:
 1970  1971  1972 -270 -1973 0
 1970  1971  1972 -270 -1974 0
 1970  1971  1972 -270  1975 0

c  1+1 --> 2
c    (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0 ∧  p_270) -> (-b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0)
c  in CNF:
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_2
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨  b^{1, 271}_1
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ -p_270 ∨ -b^{1, 271}_0
c  in DIMACS:
 1970  1971 -1972 -270 -1973 0
 1970  1971 -1972 -270  1974 0
 1970  1971 -1972 -270 -1975 0

c  2+1 --> break 
c    (-b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧  p_270) -> break
c  in CNF:
c     b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 1970 -1971  1972 -270 1162 0


c  2-1 --> 1
c    (-b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧ -p_270) -> (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0)
c  in CNF:
c     b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_2
c     b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_1
c     b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨  b^{1, 271}_0
c  in DIMACS:
 1970 -1971  1972  270 -1973 0
 1970 -1971  1972  270 -1974 0
 1970 -1971  1972  270  1975 0

c  1-1 --> 0
c    (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0 ∧ -p_270) -> (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧ -b^{1, 271}_0)
c  in CNF:
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_2
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_1
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_0
c  in DIMACS:
 1970  1971 -1972  270 -1973 0
 1970  1971 -1972  270 -1974 0
 1970  1971 -1972  270 -1975 0

c  0-1 --> -1
c    (-b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧ -p_270) -> ( b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0)
c  in CNF:
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨  b^{1, 271}_2
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_1
c     b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨  b^{1, 271}_0
c  in DIMACS:
 1970  1971  1972  270  1973 0
 1970  1971  1972  270 -1974 0
 1970  1971  1972  270  1975 0

c  -1-1 --> -2
c    ( b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧  b^{1, 270}_0 ∧ -p_270) -> ( b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0)
c  in CNF:
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨  b^{1, 271}_2
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨  b^{1, 271}_1
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨  p_270 ∨ -b^{1, 271}_0
c  in DIMACS:
-1970  1971 -1972  270  1973 0
-1970  1971 -1972  270  1974 0
-1970  1971 -1972  270 -1975 0

c  -2-1 --> break 
c    ( b^{1, 270}_2 ∧  b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨  b^{1, 270}_0 ∨  p_270 ∨ break
c  in DIMACS:
-1970 -1971  1972  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 270}_2 ∧ -b^{1, 270}_1 ∧ -b^{1, 270}_0 ∧ true) 
c  in CNF:
c    -b^{1, 270}_2 ∨  b^{1, 270}_1 ∨  b^{1, 270}_0 ∨ false 
c  in DIMACS:
-1970  1971  1972  0

c  3 does not represent an automaton state.
c    -(-b^{1, 270}_2 ∧  b^{1, 270}_1 ∧  b^{1, 270}_0 ∧ true) 
c  in CNF:
c     b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ false 
c  in DIMACS:
 1970 -1971 -1972  0
c  -3 does not represent an automaton state.
c    -( b^{1, 270}_2 ∧  b^{1, 270}_1 ∧  b^{1, 270}_0 ∧ true) 
c  in CNF:
c    -b^{1, 270}_2 ∨ -b^{1, 270}_1 ∨ -b^{1, 270}_0 ∨ false 
c  in DIMACS:
-1970 -1971 -1972  0

c i = 271
c  -2+1 --> -1
c    ( b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧  p_271) -> ( b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0)
c  in CNF:
c    -b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨  b^{1, 272}_2
c    -b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_1
c    -b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨  b^{1, 272}_0
c  in DIMACS:
-1973 -1974  1975 -271  1976 0
-1973 -1974  1975 -271 -1977 0
-1973 -1974  1975 -271  1978 0

c  -1+1 --> 0
c    ( b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0 ∧  p_271) -> (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧ -b^{1, 272}_0)
c  in CNF:
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_2
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_1
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_0
c  in DIMACS:
-1973  1974 -1975 -271 -1976 0
-1973  1974 -1975 -271 -1977 0
-1973  1974 -1975 -271 -1978 0

c  0+1 --> 1
c    (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧  p_271) -> (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0)
c  in CNF:
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_2
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_1
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨  b^{1, 272}_0
c  in DIMACS:
 1973  1974  1975 -271 -1976 0
 1973  1974  1975 -271 -1977 0
 1973  1974  1975 -271  1978 0

c  1+1 --> 2
c    (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0 ∧  p_271) -> (-b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0)
c  in CNF:
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_2
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨  b^{1, 272}_1
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ -p_271 ∨ -b^{1, 272}_0
c  in DIMACS:
 1973  1974 -1975 -271 -1976 0
 1973  1974 -1975 -271  1977 0
 1973  1974 -1975 -271 -1978 0

c  2+1 --> break 
c    (-b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧  p_271) -> break
c  in CNF:
c     b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ -p_271 ∨ break
c  in DIMACS:
 1973 -1974  1975 -271 1162 0


c  2-1 --> 1
c    (-b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧ -p_271) -> (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0)
c  in CNF:
c     b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_2
c     b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_1
c     b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨  b^{1, 272}_0
c  in DIMACS:
 1973 -1974  1975  271 -1976 0
 1973 -1974  1975  271 -1977 0
 1973 -1974  1975  271  1978 0

c  1-1 --> 0
c    (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0 ∧ -p_271) -> (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧ -b^{1, 272}_0)
c  in CNF:
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_2
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_1
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_0
c  in DIMACS:
 1973  1974 -1975  271 -1976 0
 1973  1974 -1975  271 -1977 0
 1973  1974 -1975  271 -1978 0

c  0-1 --> -1
c    (-b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧ -p_271) -> ( b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0)
c  in CNF:
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨  b^{1, 272}_2
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_1
c     b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨  b^{1, 272}_0
c  in DIMACS:
 1973  1974  1975  271  1976 0
 1973  1974  1975  271 -1977 0
 1973  1974  1975  271  1978 0

c  -1-1 --> -2
c    ( b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧  b^{1, 271}_0 ∧ -p_271) -> ( b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0)
c  in CNF:
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨  b^{1, 272}_2
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨  b^{1, 272}_1
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨  p_271 ∨ -b^{1, 272}_0
c  in DIMACS:
-1973  1974 -1975  271  1976 0
-1973  1974 -1975  271  1977 0
-1973  1974 -1975  271 -1978 0

c  -2-1 --> break 
c    ( b^{1, 271}_2 ∧  b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧ -p_271) -> break
c  in CNF:
c    -b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨  b^{1, 271}_0 ∨  p_271 ∨ break
c  in DIMACS:
-1973 -1974  1975  271 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 271}_2 ∧ -b^{1, 271}_1 ∧ -b^{1, 271}_0 ∧ true) 
c  in CNF:
c    -b^{1, 271}_2 ∨  b^{1, 271}_1 ∨  b^{1, 271}_0 ∨ false 
c  in DIMACS:
-1973  1974  1975  0

c  3 does not represent an automaton state.
c    -(-b^{1, 271}_2 ∧  b^{1, 271}_1 ∧  b^{1, 271}_0 ∧ true) 
c  in CNF:
c     b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ false 
c  in DIMACS:
 1973 -1974 -1975  0
c  -3 does not represent an automaton state.
c    -( b^{1, 271}_2 ∧  b^{1, 271}_1 ∧  b^{1, 271}_0 ∧ true) 
c  in CNF:
c    -b^{1, 271}_2 ∨ -b^{1, 271}_1 ∨ -b^{1, 271}_0 ∨ false 
c  in DIMACS:
-1973 -1974 -1975  0

c i = 272
c  -2+1 --> -1
c    ( b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧  p_272) -> ( b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0)
c  in CNF:
c    -b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨  b^{1, 273}_2
c    -b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_1
c    -b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨  b^{1, 273}_0
c  in DIMACS:
-1976 -1977  1978 -272  1979 0
-1976 -1977  1978 -272 -1980 0
-1976 -1977  1978 -272  1981 0

c  -1+1 --> 0
c    ( b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0 ∧  p_272) -> (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧ -b^{1, 273}_0)
c  in CNF:
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_2
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_1
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_0
c  in DIMACS:
-1976  1977 -1978 -272 -1979 0
-1976  1977 -1978 -272 -1980 0
-1976  1977 -1978 -272 -1981 0

c  0+1 --> 1
c    (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧  p_272) -> (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0)
c  in CNF:
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_2
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_1
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨  b^{1, 273}_0
c  in DIMACS:
 1976  1977  1978 -272 -1979 0
 1976  1977  1978 -272 -1980 0
 1976  1977  1978 -272  1981 0

c  1+1 --> 2
c    (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0 ∧  p_272) -> (-b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0)
c  in CNF:
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_2
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨  b^{1, 273}_1
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ -p_272 ∨ -b^{1, 273}_0
c  in DIMACS:
 1976  1977 -1978 -272 -1979 0
 1976  1977 -1978 -272  1980 0
 1976  1977 -1978 -272 -1981 0

c  2+1 --> break 
c    (-b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧  p_272) -> break
c  in CNF:
c     b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 1976 -1977  1978 -272 1162 0


c  2-1 --> 1
c    (-b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧ -p_272) -> (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0)
c  in CNF:
c     b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_2
c     b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_1
c     b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨  b^{1, 273}_0
c  in DIMACS:
 1976 -1977  1978  272 -1979 0
 1976 -1977  1978  272 -1980 0
 1976 -1977  1978  272  1981 0

c  1-1 --> 0
c    (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0 ∧ -p_272) -> (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧ -b^{1, 273}_0)
c  in CNF:
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_2
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_1
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_0
c  in DIMACS:
 1976  1977 -1978  272 -1979 0
 1976  1977 -1978  272 -1980 0
 1976  1977 -1978  272 -1981 0

c  0-1 --> -1
c    (-b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧ -p_272) -> ( b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0)
c  in CNF:
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨  b^{1, 273}_2
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_1
c     b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨  b^{1, 273}_0
c  in DIMACS:
 1976  1977  1978  272  1979 0
 1976  1977  1978  272 -1980 0
 1976  1977  1978  272  1981 0

c  -1-1 --> -2
c    ( b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧  b^{1, 272}_0 ∧ -p_272) -> ( b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0)
c  in CNF:
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨  b^{1, 273}_2
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨  b^{1, 273}_1
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨  p_272 ∨ -b^{1, 273}_0
c  in DIMACS:
-1976  1977 -1978  272  1979 0
-1976  1977 -1978  272  1980 0
-1976  1977 -1978  272 -1981 0

c  -2-1 --> break 
c    ( b^{1, 272}_2 ∧  b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨  b^{1, 272}_0 ∨  p_272 ∨ break
c  in DIMACS:
-1976 -1977  1978  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 272}_2 ∧ -b^{1, 272}_1 ∧ -b^{1, 272}_0 ∧ true) 
c  in CNF:
c    -b^{1, 272}_2 ∨  b^{1, 272}_1 ∨  b^{1, 272}_0 ∨ false 
c  in DIMACS:
-1976  1977  1978  0

c  3 does not represent an automaton state.
c    -(-b^{1, 272}_2 ∧  b^{1, 272}_1 ∧  b^{1, 272}_0 ∧ true) 
c  in CNF:
c     b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ false 
c  in DIMACS:
 1976 -1977 -1978  0
c  -3 does not represent an automaton state.
c    -( b^{1, 272}_2 ∧  b^{1, 272}_1 ∧  b^{1, 272}_0 ∧ true) 
c  in CNF:
c    -b^{1, 272}_2 ∨ -b^{1, 272}_1 ∨ -b^{1, 272}_0 ∨ false 
c  in DIMACS:
-1976 -1977 -1978  0

c i = 273
c  -2+1 --> -1
c    ( b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧  p_273) -> ( b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0)
c  in CNF:
c    -b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨  b^{1, 274}_2
c    -b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_1
c    -b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨  b^{1, 274}_0
c  in DIMACS:
-1979 -1980  1981 -273  1982 0
-1979 -1980  1981 -273 -1983 0
-1979 -1980  1981 -273  1984 0

c  -1+1 --> 0
c    ( b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0 ∧  p_273) -> (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧ -b^{1, 274}_0)
c  in CNF:
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_2
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_1
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_0
c  in DIMACS:
-1979  1980 -1981 -273 -1982 0
-1979  1980 -1981 -273 -1983 0
-1979  1980 -1981 -273 -1984 0

c  0+1 --> 1
c    (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧  p_273) -> (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0)
c  in CNF:
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_2
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_1
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨  b^{1, 274}_0
c  in DIMACS:
 1979  1980  1981 -273 -1982 0
 1979  1980  1981 -273 -1983 0
 1979  1980  1981 -273  1984 0

c  1+1 --> 2
c    (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0 ∧  p_273) -> (-b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0)
c  in CNF:
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_2
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨  b^{1, 274}_1
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ -p_273 ∨ -b^{1, 274}_0
c  in DIMACS:
 1979  1980 -1981 -273 -1982 0
 1979  1980 -1981 -273  1983 0
 1979  1980 -1981 -273 -1984 0

c  2+1 --> break 
c    (-b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧  p_273) -> break
c  in CNF:
c     b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 1979 -1980  1981 -273 1162 0


c  2-1 --> 1
c    (-b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧ -p_273) -> (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0)
c  in CNF:
c     b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_2
c     b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_1
c     b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨  b^{1, 274}_0
c  in DIMACS:
 1979 -1980  1981  273 -1982 0
 1979 -1980  1981  273 -1983 0
 1979 -1980  1981  273  1984 0

c  1-1 --> 0
c    (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0 ∧ -p_273) -> (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧ -b^{1, 274}_0)
c  in CNF:
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_2
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_1
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_0
c  in DIMACS:
 1979  1980 -1981  273 -1982 0
 1979  1980 -1981  273 -1983 0
 1979  1980 -1981  273 -1984 0

c  0-1 --> -1
c    (-b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧ -p_273) -> ( b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0)
c  in CNF:
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨  b^{1, 274}_2
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_1
c     b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨  b^{1, 274}_0
c  in DIMACS:
 1979  1980  1981  273  1982 0
 1979  1980  1981  273 -1983 0
 1979  1980  1981  273  1984 0

c  -1-1 --> -2
c    ( b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧  b^{1, 273}_0 ∧ -p_273) -> ( b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0)
c  in CNF:
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨  b^{1, 274}_2
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨  b^{1, 274}_1
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨  p_273 ∨ -b^{1, 274}_0
c  in DIMACS:
-1979  1980 -1981  273  1982 0
-1979  1980 -1981  273  1983 0
-1979  1980 -1981  273 -1984 0

c  -2-1 --> break 
c    ( b^{1, 273}_2 ∧  b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨  b^{1, 273}_0 ∨  p_273 ∨ break
c  in DIMACS:
-1979 -1980  1981  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 273}_2 ∧ -b^{1, 273}_1 ∧ -b^{1, 273}_0 ∧ true) 
c  in CNF:
c    -b^{1, 273}_2 ∨  b^{1, 273}_1 ∨  b^{1, 273}_0 ∨ false 
c  in DIMACS:
-1979  1980  1981  0

c  3 does not represent an automaton state.
c    -(-b^{1, 273}_2 ∧  b^{1, 273}_1 ∧  b^{1, 273}_0 ∧ true) 
c  in CNF:
c     b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ false 
c  in DIMACS:
 1979 -1980 -1981  0
c  -3 does not represent an automaton state.
c    -( b^{1, 273}_2 ∧  b^{1, 273}_1 ∧  b^{1, 273}_0 ∧ true) 
c  in CNF:
c    -b^{1, 273}_2 ∨ -b^{1, 273}_1 ∨ -b^{1, 273}_0 ∨ false 
c  in DIMACS:
-1979 -1980 -1981  0

c i = 274
c  -2+1 --> -1
c    ( b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧  p_274) -> ( b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0)
c  in CNF:
c    -b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨  b^{1, 275}_2
c    -b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_1
c    -b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨  b^{1, 275}_0
c  in DIMACS:
-1982 -1983  1984 -274  1985 0
-1982 -1983  1984 -274 -1986 0
-1982 -1983  1984 -274  1987 0

c  -1+1 --> 0
c    ( b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0 ∧  p_274) -> (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧ -b^{1, 275}_0)
c  in CNF:
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_2
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_1
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_0
c  in DIMACS:
-1982  1983 -1984 -274 -1985 0
-1982  1983 -1984 -274 -1986 0
-1982  1983 -1984 -274 -1987 0

c  0+1 --> 1
c    (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧  p_274) -> (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0)
c  in CNF:
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_2
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_1
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨  b^{1, 275}_0
c  in DIMACS:
 1982  1983  1984 -274 -1985 0
 1982  1983  1984 -274 -1986 0
 1982  1983  1984 -274  1987 0

c  1+1 --> 2
c    (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0 ∧  p_274) -> (-b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0)
c  in CNF:
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_2
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨  b^{1, 275}_1
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ -p_274 ∨ -b^{1, 275}_0
c  in DIMACS:
 1982  1983 -1984 -274 -1985 0
 1982  1983 -1984 -274  1986 0
 1982  1983 -1984 -274 -1987 0

c  2+1 --> break 
c    (-b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧  p_274) -> break
c  in CNF:
c     b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ -p_274 ∨ break
c  in DIMACS:
 1982 -1983  1984 -274 1162 0


c  2-1 --> 1
c    (-b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧ -p_274) -> (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0)
c  in CNF:
c     b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_2
c     b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_1
c     b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨  b^{1, 275}_0
c  in DIMACS:
 1982 -1983  1984  274 -1985 0
 1982 -1983  1984  274 -1986 0
 1982 -1983  1984  274  1987 0

c  1-1 --> 0
c    (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0 ∧ -p_274) -> (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧ -b^{1, 275}_0)
c  in CNF:
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_2
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_1
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_0
c  in DIMACS:
 1982  1983 -1984  274 -1985 0
 1982  1983 -1984  274 -1986 0
 1982  1983 -1984  274 -1987 0

c  0-1 --> -1
c    (-b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧ -p_274) -> ( b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0)
c  in CNF:
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨  b^{1, 275}_2
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_1
c     b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨  b^{1, 275}_0
c  in DIMACS:
 1982  1983  1984  274  1985 0
 1982  1983  1984  274 -1986 0
 1982  1983  1984  274  1987 0

c  -1-1 --> -2
c    ( b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧  b^{1, 274}_0 ∧ -p_274) -> ( b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0)
c  in CNF:
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨  b^{1, 275}_2
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨  b^{1, 275}_1
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨  p_274 ∨ -b^{1, 275}_0
c  in DIMACS:
-1982  1983 -1984  274  1985 0
-1982  1983 -1984  274  1986 0
-1982  1983 -1984  274 -1987 0

c  -2-1 --> break 
c    ( b^{1, 274}_2 ∧  b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧ -p_274) -> break
c  in CNF:
c    -b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨  b^{1, 274}_0 ∨  p_274 ∨ break
c  in DIMACS:
-1982 -1983  1984  274 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 274}_2 ∧ -b^{1, 274}_1 ∧ -b^{1, 274}_0 ∧ true) 
c  in CNF:
c    -b^{1, 274}_2 ∨  b^{1, 274}_1 ∨  b^{1, 274}_0 ∨ false 
c  in DIMACS:
-1982  1983  1984  0

c  3 does not represent an automaton state.
c    -(-b^{1, 274}_2 ∧  b^{1, 274}_1 ∧  b^{1, 274}_0 ∧ true) 
c  in CNF:
c     b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ false 
c  in DIMACS:
 1982 -1983 -1984  0
c  -3 does not represent an automaton state.
c    -( b^{1, 274}_2 ∧  b^{1, 274}_1 ∧  b^{1, 274}_0 ∧ true) 
c  in CNF:
c    -b^{1, 274}_2 ∨ -b^{1, 274}_1 ∨ -b^{1, 274}_0 ∨ false 
c  in DIMACS:
-1982 -1983 -1984  0

c i = 275
c  -2+1 --> -1
c    ( b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧  p_275) -> ( b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0)
c  in CNF:
c    -b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨  b^{1, 276}_2
c    -b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_1
c    -b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨  b^{1, 276}_0
c  in DIMACS:
-1985 -1986  1987 -275  1988 0
-1985 -1986  1987 -275 -1989 0
-1985 -1986  1987 -275  1990 0

c  -1+1 --> 0
c    ( b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0 ∧  p_275) -> (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧ -b^{1, 276}_0)
c  in CNF:
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_2
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_1
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_0
c  in DIMACS:
-1985  1986 -1987 -275 -1988 0
-1985  1986 -1987 -275 -1989 0
-1985  1986 -1987 -275 -1990 0

c  0+1 --> 1
c    (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧  p_275) -> (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0)
c  in CNF:
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_2
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_1
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨  b^{1, 276}_0
c  in DIMACS:
 1985  1986  1987 -275 -1988 0
 1985  1986  1987 -275 -1989 0
 1985  1986  1987 -275  1990 0

c  1+1 --> 2
c    (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0 ∧  p_275) -> (-b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0)
c  in CNF:
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_2
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨  b^{1, 276}_1
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ -p_275 ∨ -b^{1, 276}_0
c  in DIMACS:
 1985  1986 -1987 -275 -1988 0
 1985  1986 -1987 -275  1989 0
 1985  1986 -1987 -275 -1990 0

c  2+1 --> break 
c    (-b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧  p_275) -> break
c  in CNF:
c     b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 1985 -1986  1987 -275 1162 0


c  2-1 --> 1
c    (-b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧ -p_275) -> (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0)
c  in CNF:
c     b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_2
c     b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_1
c     b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨  b^{1, 276}_0
c  in DIMACS:
 1985 -1986  1987  275 -1988 0
 1985 -1986  1987  275 -1989 0
 1985 -1986  1987  275  1990 0

c  1-1 --> 0
c    (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0 ∧ -p_275) -> (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧ -b^{1, 276}_0)
c  in CNF:
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_2
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_1
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_0
c  in DIMACS:
 1985  1986 -1987  275 -1988 0
 1985  1986 -1987  275 -1989 0
 1985  1986 -1987  275 -1990 0

c  0-1 --> -1
c    (-b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧ -p_275) -> ( b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0)
c  in CNF:
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨  b^{1, 276}_2
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_1
c     b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨  b^{1, 276}_0
c  in DIMACS:
 1985  1986  1987  275  1988 0
 1985  1986  1987  275 -1989 0
 1985  1986  1987  275  1990 0

c  -1-1 --> -2
c    ( b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧  b^{1, 275}_0 ∧ -p_275) -> ( b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0)
c  in CNF:
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨  b^{1, 276}_2
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨  b^{1, 276}_1
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨  p_275 ∨ -b^{1, 276}_0
c  in DIMACS:
-1985  1986 -1987  275  1988 0
-1985  1986 -1987  275  1989 0
-1985  1986 -1987  275 -1990 0

c  -2-1 --> break 
c    ( b^{1, 275}_2 ∧  b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨  b^{1, 275}_0 ∨  p_275 ∨ break
c  in DIMACS:
-1985 -1986  1987  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 275}_2 ∧ -b^{1, 275}_1 ∧ -b^{1, 275}_0 ∧ true) 
c  in CNF:
c    -b^{1, 275}_2 ∨  b^{1, 275}_1 ∨  b^{1, 275}_0 ∨ false 
c  in DIMACS:
-1985  1986  1987  0

c  3 does not represent an automaton state.
c    -(-b^{1, 275}_2 ∧  b^{1, 275}_1 ∧  b^{1, 275}_0 ∧ true) 
c  in CNF:
c     b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ false 
c  in DIMACS:
 1985 -1986 -1987  0
c  -3 does not represent an automaton state.
c    -( b^{1, 275}_2 ∧  b^{1, 275}_1 ∧  b^{1, 275}_0 ∧ true) 
c  in CNF:
c    -b^{1, 275}_2 ∨ -b^{1, 275}_1 ∨ -b^{1, 275}_0 ∨ false 
c  in DIMACS:
-1985 -1986 -1987  0

c i = 276
c  -2+1 --> -1
c    ( b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧  p_276) -> ( b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0)
c  in CNF:
c    -b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨  b^{1, 277}_2
c    -b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_1
c    -b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨  b^{1, 277}_0
c  in DIMACS:
-1988 -1989  1990 -276  1991 0
-1988 -1989  1990 -276 -1992 0
-1988 -1989  1990 -276  1993 0

c  -1+1 --> 0
c    ( b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0 ∧  p_276) -> (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧ -b^{1, 277}_0)
c  in CNF:
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_2
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_1
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_0
c  in DIMACS:
-1988  1989 -1990 -276 -1991 0
-1988  1989 -1990 -276 -1992 0
-1988  1989 -1990 -276 -1993 0

c  0+1 --> 1
c    (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧  p_276) -> (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0)
c  in CNF:
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_2
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_1
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨  b^{1, 277}_0
c  in DIMACS:
 1988  1989  1990 -276 -1991 0
 1988  1989  1990 -276 -1992 0
 1988  1989  1990 -276  1993 0

c  1+1 --> 2
c    (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0 ∧  p_276) -> (-b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0)
c  in CNF:
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_2
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨  b^{1, 277}_1
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ -p_276 ∨ -b^{1, 277}_0
c  in DIMACS:
 1988  1989 -1990 -276 -1991 0
 1988  1989 -1990 -276  1992 0
 1988  1989 -1990 -276 -1993 0

c  2+1 --> break 
c    (-b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧  p_276) -> break
c  in CNF:
c     b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 1988 -1989  1990 -276 1162 0


c  2-1 --> 1
c    (-b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧ -p_276) -> (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0)
c  in CNF:
c     b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_2
c     b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_1
c     b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨  b^{1, 277}_0
c  in DIMACS:
 1988 -1989  1990  276 -1991 0
 1988 -1989  1990  276 -1992 0
 1988 -1989  1990  276  1993 0

c  1-1 --> 0
c    (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0 ∧ -p_276) -> (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧ -b^{1, 277}_0)
c  in CNF:
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_2
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_1
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_0
c  in DIMACS:
 1988  1989 -1990  276 -1991 0
 1988  1989 -1990  276 -1992 0
 1988  1989 -1990  276 -1993 0

c  0-1 --> -1
c    (-b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧ -p_276) -> ( b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0)
c  in CNF:
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨  b^{1, 277}_2
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_1
c     b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨  b^{1, 277}_0
c  in DIMACS:
 1988  1989  1990  276  1991 0
 1988  1989  1990  276 -1992 0
 1988  1989  1990  276  1993 0

c  -1-1 --> -2
c    ( b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧  b^{1, 276}_0 ∧ -p_276) -> ( b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0)
c  in CNF:
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨  b^{1, 277}_2
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨  b^{1, 277}_1
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨  p_276 ∨ -b^{1, 277}_0
c  in DIMACS:
-1988  1989 -1990  276  1991 0
-1988  1989 -1990  276  1992 0
-1988  1989 -1990  276 -1993 0

c  -2-1 --> break 
c    ( b^{1, 276}_2 ∧  b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨  b^{1, 276}_0 ∨  p_276 ∨ break
c  in DIMACS:
-1988 -1989  1990  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 276}_2 ∧ -b^{1, 276}_1 ∧ -b^{1, 276}_0 ∧ true) 
c  in CNF:
c    -b^{1, 276}_2 ∨  b^{1, 276}_1 ∨  b^{1, 276}_0 ∨ false 
c  in DIMACS:
-1988  1989  1990  0

c  3 does not represent an automaton state.
c    -(-b^{1, 276}_2 ∧  b^{1, 276}_1 ∧  b^{1, 276}_0 ∧ true) 
c  in CNF:
c     b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ false 
c  in DIMACS:
 1988 -1989 -1990  0
c  -3 does not represent an automaton state.
c    -( b^{1, 276}_2 ∧  b^{1, 276}_1 ∧  b^{1, 276}_0 ∧ true) 
c  in CNF:
c    -b^{1, 276}_2 ∨ -b^{1, 276}_1 ∨ -b^{1, 276}_0 ∨ false 
c  in DIMACS:
-1988 -1989 -1990  0

c i = 277
c  -2+1 --> -1
c    ( b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧  p_277) -> ( b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0)
c  in CNF:
c    -b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨  b^{1, 278}_2
c    -b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_1
c    -b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨  b^{1, 278}_0
c  in DIMACS:
-1991 -1992  1993 -277  1994 0
-1991 -1992  1993 -277 -1995 0
-1991 -1992  1993 -277  1996 0

c  -1+1 --> 0
c    ( b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0 ∧  p_277) -> (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧ -b^{1, 278}_0)
c  in CNF:
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_2
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_1
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_0
c  in DIMACS:
-1991  1992 -1993 -277 -1994 0
-1991  1992 -1993 -277 -1995 0
-1991  1992 -1993 -277 -1996 0

c  0+1 --> 1
c    (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧  p_277) -> (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0)
c  in CNF:
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_2
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_1
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨  b^{1, 278}_0
c  in DIMACS:
 1991  1992  1993 -277 -1994 0
 1991  1992  1993 -277 -1995 0
 1991  1992  1993 -277  1996 0

c  1+1 --> 2
c    (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0 ∧  p_277) -> (-b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0)
c  in CNF:
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_2
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨  b^{1, 278}_1
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ -p_277 ∨ -b^{1, 278}_0
c  in DIMACS:
 1991  1992 -1993 -277 -1994 0
 1991  1992 -1993 -277  1995 0
 1991  1992 -1993 -277 -1996 0

c  2+1 --> break 
c    (-b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧  p_277) -> break
c  in CNF:
c     b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ -p_277 ∨ break
c  in DIMACS:
 1991 -1992  1993 -277 1162 0


c  2-1 --> 1
c    (-b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧ -p_277) -> (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0)
c  in CNF:
c     b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_2
c     b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_1
c     b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨  b^{1, 278}_0
c  in DIMACS:
 1991 -1992  1993  277 -1994 0
 1991 -1992  1993  277 -1995 0
 1991 -1992  1993  277  1996 0

c  1-1 --> 0
c    (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0 ∧ -p_277) -> (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧ -b^{1, 278}_0)
c  in CNF:
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_2
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_1
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_0
c  in DIMACS:
 1991  1992 -1993  277 -1994 0
 1991  1992 -1993  277 -1995 0
 1991  1992 -1993  277 -1996 0

c  0-1 --> -1
c    (-b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧ -p_277) -> ( b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0)
c  in CNF:
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨  b^{1, 278}_2
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_1
c     b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨  b^{1, 278}_0
c  in DIMACS:
 1991  1992  1993  277  1994 0
 1991  1992  1993  277 -1995 0
 1991  1992  1993  277  1996 0

c  -1-1 --> -2
c    ( b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧  b^{1, 277}_0 ∧ -p_277) -> ( b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0)
c  in CNF:
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨  b^{1, 278}_2
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨  b^{1, 278}_1
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨  p_277 ∨ -b^{1, 278}_0
c  in DIMACS:
-1991  1992 -1993  277  1994 0
-1991  1992 -1993  277  1995 0
-1991  1992 -1993  277 -1996 0

c  -2-1 --> break 
c    ( b^{1, 277}_2 ∧  b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧ -p_277) -> break
c  in CNF:
c    -b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨  b^{1, 277}_0 ∨  p_277 ∨ break
c  in DIMACS:
-1991 -1992  1993  277 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 277}_2 ∧ -b^{1, 277}_1 ∧ -b^{1, 277}_0 ∧ true) 
c  in CNF:
c    -b^{1, 277}_2 ∨  b^{1, 277}_1 ∨  b^{1, 277}_0 ∨ false 
c  in DIMACS:
-1991  1992  1993  0

c  3 does not represent an automaton state.
c    -(-b^{1, 277}_2 ∧  b^{1, 277}_1 ∧  b^{1, 277}_0 ∧ true) 
c  in CNF:
c     b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ false 
c  in DIMACS:
 1991 -1992 -1993  0
c  -3 does not represent an automaton state.
c    -( b^{1, 277}_2 ∧  b^{1, 277}_1 ∧  b^{1, 277}_0 ∧ true) 
c  in CNF:
c    -b^{1, 277}_2 ∨ -b^{1, 277}_1 ∨ -b^{1, 277}_0 ∨ false 
c  in DIMACS:
-1991 -1992 -1993  0

c i = 278
c  -2+1 --> -1
c    ( b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧  p_278) -> ( b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0)
c  in CNF:
c    -b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨  b^{1, 279}_2
c    -b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_1
c    -b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨  b^{1, 279}_0
c  in DIMACS:
-1994 -1995  1996 -278  1997 0
-1994 -1995  1996 -278 -1998 0
-1994 -1995  1996 -278  1999 0

c  -1+1 --> 0
c    ( b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0 ∧  p_278) -> (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧ -b^{1, 279}_0)
c  in CNF:
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_2
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_1
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_0
c  in DIMACS:
-1994  1995 -1996 -278 -1997 0
-1994  1995 -1996 -278 -1998 0
-1994  1995 -1996 -278 -1999 0

c  0+1 --> 1
c    (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧  p_278) -> (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0)
c  in CNF:
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_2
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_1
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨  b^{1, 279}_0
c  in DIMACS:
 1994  1995  1996 -278 -1997 0
 1994  1995  1996 -278 -1998 0
 1994  1995  1996 -278  1999 0

c  1+1 --> 2
c    (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0 ∧  p_278) -> (-b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0)
c  in CNF:
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_2
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨  b^{1, 279}_1
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ -p_278 ∨ -b^{1, 279}_0
c  in DIMACS:
 1994  1995 -1996 -278 -1997 0
 1994  1995 -1996 -278  1998 0
 1994  1995 -1996 -278 -1999 0

c  2+1 --> break 
c    (-b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧  p_278) -> break
c  in CNF:
c     b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ -p_278 ∨ break
c  in DIMACS:
 1994 -1995  1996 -278 1162 0


c  2-1 --> 1
c    (-b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧ -p_278) -> (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0)
c  in CNF:
c     b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_2
c     b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_1
c     b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨  b^{1, 279}_0
c  in DIMACS:
 1994 -1995  1996  278 -1997 0
 1994 -1995  1996  278 -1998 0
 1994 -1995  1996  278  1999 0

c  1-1 --> 0
c    (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0 ∧ -p_278) -> (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧ -b^{1, 279}_0)
c  in CNF:
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_2
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_1
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_0
c  in DIMACS:
 1994  1995 -1996  278 -1997 0
 1994  1995 -1996  278 -1998 0
 1994  1995 -1996  278 -1999 0

c  0-1 --> -1
c    (-b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧ -p_278) -> ( b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0)
c  in CNF:
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨  b^{1, 279}_2
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_1
c     b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨  b^{1, 279}_0
c  in DIMACS:
 1994  1995  1996  278  1997 0
 1994  1995  1996  278 -1998 0
 1994  1995  1996  278  1999 0

c  -1-1 --> -2
c    ( b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧  b^{1, 278}_0 ∧ -p_278) -> ( b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0)
c  in CNF:
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨  b^{1, 279}_2
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨  b^{1, 279}_1
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨  p_278 ∨ -b^{1, 279}_0
c  in DIMACS:
-1994  1995 -1996  278  1997 0
-1994  1995 -1996  278  1998 0
-1994  1995 -1996  278 -1999 0

c  -2-1 --> break 
c    ( b^{1, 278}_2 ∧  b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧ -p_278) -> break
c  in CNF:
c    -b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨  b^{1, 278}_0 ∨  p_278 ∨ break
c  in DIMACS:
-1994 -1995  1996  278 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 278}_2 ∧ -b^{1, 278}_1 ∧ -b^{1, 278}_0 ∧ true) 
c  in CNF:
c    -b^{1, 278}_2 ∨  b^{1, 278}_1 ∨  b^{1, 278}_0 ∨ false 
c  in DIMACS:
-1994  1995  1996  0

c  3 does not represent an automaton state.
c    -(-b^{1, 278}_2 ∧  b^{1, 278}_1 ∧  b^{1, 278}_0 ∧ true) 
c  in CNF:
c     b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ false 
c  in DIMACS:
 1994 -1995 -1996  0
c  -3 does not represent an automaton state.
c    -( b^{1, 278}_2 ∧  b^{1, 278}_1 ∧  b^{1, 278}_0 ∧ true) 
c  in CNF:
c    -b^{1, 278}_2 ∨ -b^{1, 278}_1 ∨ -b^{1, 278}_0 ∨ false 
c  in DIMACS:
-1994 -1995 -1996  0

c i = 279
c  -2+1 --> -1
c    ( b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧  p_279) -> ( b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0)
c  in CNF:
c    -b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨  b^{1, 280}_2
c    -b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_1
c    -b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨  b^{1, 280}_0
c  in DIMACS:
-1997 -1998  1999 -279  2000 0
-1997 -1998  1999 -279 -2001 0
-1997 -1998  1999 -279  2002 0

c  -1+1 --> 0
c    ( b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0 ∧  p_279) -> (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧ -b^{1, 280}_0)
c  in CNF:
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_2
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_1
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_0
c  in DIMACS:
-1997  1998 -1999 -279 -2000 0
-1997  1998 -1999 -279 -2001 0
-1997  1998 -1999 -279 -2002 0

c  0+1 --> 1
c    (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧  p_279) -> (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0)
c  in CNF:
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_2
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_1
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨  b^{1, 280}_0
c  in DIMACS:
 1997  1998  1999 -279 -2000 0
 1997  1998  1999 -279 -2001 0
 1997  1998  1999 -279  2002 0

c  1+1 --> 2
c    (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0 ∧  p_279) -> (-b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0)
c  in CNF:
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_2
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨  b^{1, 280}_1
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ -p_279 ∨ -b^{1, 280}_0
c  in DIMACS:
 1997  1998 -1999 -279 -2000 0
 1997  1998 -1999 -279  2001 0
 1997  1998 -1999 -279 -2002 0

c  2+1 --> break 
c    (-b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧  p_279) -> break
c  in CNF:
c     b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 1997 -1998  1999 -279 1162 0


c  2-1 --> 1
c    (-b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧ -p_279) -> (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0)
c  in CNF:
c     b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_2
c     b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_1
c     b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨  b^{1, 280}_0
c  in DIMACS:
 1997 -1998  1999  279 -2000 0
 1997 -1998  1999  279 -2001 0
 1997 -1998  1999  279  2002 0

c  1-1 --> 0
c    (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0 ∧ -p_279) -> (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧ -b^{1, 280}_0)
c  in CNF:
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_2
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_1
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_0
c  in DIMACS:
 1997  1998 -1999  279 -2000 0
 1997  1998 -1999  279 -2001 0
 1997  1998 -1999  279 -2002 0

c  0-1 --> -1
c    (-b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧ -p_279) -> ( b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0)
c  in CNF:
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨  b^{1, 280}_2
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_1
c     b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨  b^{1, 280}_0
c  in DIMACS:
 1997  1998  1999  279  2000 0
 1997  1998  1999  279 -2001 0
 1997  1998  1999  279  2002 0

c  -1-1 --> -2
c    ( b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧  b^{1, 279}_0 ∧ -p_279) -> ( b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0)
c  in CNF:
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨  b^{1, 280}_2
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨  b^{1, 280}_1
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨  p_279 ∨ -b^{1, 280}_0
c  in DIMACS:
-1997  1998 -1999  279  2000 0
-1997  1998 -1999  279  2001 0
-1997  1998 -1999  279 -2002 0

c  -2-1 --> break 
c    ( b^{1, 279}_2 ∧  b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨  b^{1, 279}_0 ∨  p_279 ∨ break
c  in DIMACS:
-1997 -1998  1999  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 279}_2 ∧ -b^{1, 279}_1 ∧ -b^{1, 279}_0 ∧ true) 
c  in CNF:
c    -b^{1, 279}_2 ∨  b^{1, 279}_1 ∨  b^{1, 279}_0 ∨ false 
c  in DIMACS:
-1997  1998  1999  0

c  3 does not represent an automaton state.
c    -(-b^{1, 279}_2 ∧  b^{1, 279}_1 ∧  b^{1, 279}_0 ∧ true) 
c  in CNF:
c     b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ false 
c  in DIMACS:
 1997 -1998 -1999  0
c  -3 does not represent an automaton state.
c    -( b^{1, 279}_2 ∧  b^{1, 279}_1 ∧  b^{1, 279}_0 ∧ true) 
c  in CNF:
c    -b^{1, 279}_2 ∨ -b^{1, 279}_1 ∨ -b^{1, 279}_0 ∨ false 
c  in DIMACS:
-1997 -1998 -1999  0

c i = 280
c  -2+1 --> -1
c    ( b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧  p_280) -> ( b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0)
c  in CNF:
c    -b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨  b^{1, 281}_2
c    -b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_1
c    -b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨  b^{1, 281}_0
c  in DIMACS:
-2000 -2001  2002 -280  2003 0
-2000 -2001  2002 -280 -2004 0
-2000 -2001  2002 -280  2005 0

c  -1+1 --> 0
c    ( b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0 ∧  p_280) -> (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧ -b^{1, 281}_0)
c  in CNF:
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_2
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_1
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_0
c  in DIMACS:
-2000  2001 -2002 -280 -2003 0
-2000  2001 -2002 -280 -2004 0
-2000  2001 -2002 -280 -2005 0

c  0+1 --> 1
c    (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧  p_280) -> (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0)
c  in CNF:
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_2
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_1
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨  b^{1, 281}_0
c  in DIMACS:
 2000  2001  2002 -280 -2003 0
 2000  2001  2002 -280 -2004 0
 2000  2001  2002 -280  2005 0

c  1+1 --> 2
c    (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0 ∧  p_280) -> (-b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0)
c  in CNF:
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_2
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨  b^{1, 281}_1
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ -p_280 ∨ -b^{1, 281}_0
c  in DIMACS:
 2000  2001 -2002 -280 -2003 0
 2000  2001 -2002 -280  2004 0
 2000  2001 -2002 -280 -2005 0

c  2+1 --> break 
c    (-b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧  p_280) -> break
c  in CNF:
c     b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 2000 -2001  2002 -280 1162 0


c  2-1 --> 1
c    (-b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧ -p_280) -> (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0)
c  in CNF:
c     b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_2
c     b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_1
c     b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨  b^{1, 281}_0
c  in DIMACS:
 2000 -2001  2002  280 -2003 0
 2000 -2001  2002  280 -2004 0
 2000 -2001  2002  280  2005 0

c  1-1 --> 0
c    (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0 ∧ -p_280) -> (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧ -b^{1, 281}_0)
c  in CNF:
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_2
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_1
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_0
c  in DIMACS:
 2000  2001 -2002  280 -2003 0
 2000  2001 -2002  280 -2004 0
 2000  2001 -2002  280 -2005 0

c  0-1 --> -1
c    (-b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧ -p_280) -> ( b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0)
c  in CNF:
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨  b^{1, 281}_2
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_1
c     b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨  b^{1, 281}_0
c  in DIMACS:
 2000  2001  2002  280  2003 0
 2000  2001  2002  280 -2004 0
 2000  2001  2002  280  2005 0

c  -1-1 --> -2
c    ( b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧  b^{1, 280}_0 ∧ -p_280) -> ( b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0)
c  in CNF:
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨  b^{1, 281}_2
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨  b^{1, 281}_1
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨  p_280 ∨ -b^{1, 281}_0
c  in DIMACS:
-2000  2001 -2002  280  2003 0
-2000  2001 -2002  280  2004 0
-2000  2001 -2002  280 -2005 0

c  -2-1 --> break 
c    ( b^{1, 280}_2 ∧  b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨  b^{1, 280}_0 ∨  p_280 ∨ break
c  in DIMACS:
-2000 -2001  2002  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 280}_2 ∧ -b^{1, 280}_1 ∧ -b^{1, 280}_0 ∧ true) 
c  in CNF:
c    -b^{1, 280}_2 ∨  b^{1, 280}_1 ∨  b^{1, 280}_0 ∨ false 
c  in DIMACS:
-2000  2001  2002  0

c  3 does not represent an automaton state.
c    -(-b^{1, 280}_2 ∧  b^{1, 280}_1 ∧  b^{1, 280}_0 ∧ true) 
c  in CNF:
c     b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ false 
c  in DIMACS:
 2000 -2001 -2002  0
c  -3 does not represent an automaton state.
c    -( b^{1, 280}_2 ∧  b^{1, 280}_1 ∧  b^{1, 280}_0 ∧ true) 
c  in CNF:
c    -b^{1, 280}_2 ∨ -b^{1, 280}_1 ∨ -b^{1, 280}_0 ∨ false 
c  in DIMACS:
-2000 -2001 -2002  0

c i = 281
c  -2+1 --> -1
c    ( b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧  p_281) -> ( b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0)
c  in CNF:
c    -b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨  b^{1, 282}_2
c    -b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_1
c    -b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨  b^{1, 282}_0
c  in DIMACS:
-2003 -2004  2005 -281  2006 0
-2003 -2004  2005 -281 -2007 0
-2003 -2004  2005 -281  2008 0

c  -1+1 --> 0
c    ( b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0 ∧  p_281) -> (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧ -b^{1, 282}_0)
c  in CNF:
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_2
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_1
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_0
c  in DIMACS:
-2003  2004 -2005 -281 -2006 0
-2003  2004 -2005 -281 -2007 0
-2003  2004 -2005 -281 -2008 0

c  0+1 --> 1
c    (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧  p_281) -> (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0)
c  in CNF:
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_2
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_1
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨  b^{1, 282}_0
c  in DIMACS:
 2003  2004  2005 -281 -2006 0
 2003  2004  2005 -281 -2007 0
 2003  2004  2005 -281  2008 0

c  1+1 --> 2
c    (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0 ∧  p_281) -> (-b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0)
c  in CNF:
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_2
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨  b^{1, 282}_1
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ -p_281 ∨ -b^{1, 282}_0
c  in DIMACS:
 2003  2004 -2005 -281 -2006 0
 2003  2004 -2005 -281  2007 0
 2003  2004 -2005 -281 -2008 0

c  2+1 --> break 
c    (-b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧  p_281) -> break
c  in CNF:
c     b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ -p_281 ∨ break
c  in DIMACS:
 2003 -2004  2005 -281 1162 0


c  2-1 --> 1
c    (-b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧ -p_281) -> (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0)
c  in CNF:
c     b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_2
c     b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_1
c     b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨  b^{1, 282}_0
c  in DIMACS:
 2003 -2004  2005  281 -2006 0
 2003 -2004  2005  281 -2007 0
 2003 -2004  2005  281  2008 0

c  1-1 --> 0
c    (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0 ∧ -p_281) -> (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧ -b^{1, 282}_0)
c  in CNF:
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_2
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_1
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_0
c  in DIMACS:
 2003  2004 -2005  281 -2006 0
 2003  2004 -2005  281 -2007 0
 2003  2004 -2005  281 -2008 0

c  0-1 --> -1
c    (-b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧ -p_281) -> ( b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0)
c  in CNF:
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨  b^{1, 282}_2
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_1
c     b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨  b^{1, 282}_0
c  in DIMACS:
 2003  2004  2005  281  2006 0
 2003  2004  2005  281 -2007 0
 2003  2004  2005  281  2008 0

c  -1-1 --> -2
c    ( b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧  b^{1, 281}_0 ∧ -p_281) -> ( b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0)
c  in CNF:
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨  b^{1, 282}_2
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨  b^{1, 282}_1
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨  p_281 ∨ -b^{1, 282}_0
c  in DIMACS:
-2003  2004 -2005  281  2006 0
-2003  2004 -2005  281  2007 0
-2003  2004 -2005  281 -2008 0

c  -2-1 --> break 
c    ( b^{1, 281}_2 ∧  b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧ -p_281) -> break
c  in CNF:
c    -b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨  b^{1, 281}_0 ∨  p_281 ∨ break
c  in DIMACS:
-2003 -2004  2005  281 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 281}_2 ∧ -b^{1, 281}_1 ∧ -b^{1, 281}_0 ∧ true) 
c  in CNF:
c    -b^{1, 281}_2 ∨  b^{1, 281}_1 ∨  b^{1, 281}_0 ∨ false 
c  in DIMACS:
-2003  2004  2005  0

c  3 does not represent an automaton state.
c    -(-b^{1, 281}_2 ∧  b^{1, 281}_1 ∧  b^{1, 281}_0 ∧ true) 
c  in CNF:
c     b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ false 
c  in DIMACS:
 2003 -2004 -2005  0
c  -3 does not represent an automaton state.
c    -( b^{1, 281}_2 ∧  b^{1, 281}_1 ∧  b^{1, 281}_0 ∧ true) 
c  in CNF:
c    -b^{1, 281}_2 ∨ -b^{1, 281}_1 ∨ -b^{1, 281}_0 ∨ false 
c  in DIMACS:
-2003 -2004 -2005  0

c i = 282
c  -2+1 --> -1
c    ( b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧  p_282) -> ( b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0)
c  in CNF:
c    -b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨  b^{1, 283}_2
c    -b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_1
c    -b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨  b^{1, 283}_0
c  in DIMACS:
-2006 -2007  2008 -282  2009 0
-2006 -2007  2008 -282 -2010 0
-2006 -2007  2008 -282  2011 0

c  -1+1 --> 0
c    ( b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0 ∧  p_282) -> (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧ -b^{1, 283}_0)
c  in CNF:
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_2
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_1
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_0
c  in DIMACS:
-2006  2007 -2008 -282 -2009 0
-2006  2007 -2008 -282 -2010 0
-2006  2007 -2008 -282 -2011 0

c  0+1 --> 1
c    (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧  p_282) -> (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0)
c  in CNF:
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_2
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_1
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨  b^{1, 283}_0
c  in DIMACS:
 2006  2007  2008 -282 -2009 0
 2006  2007  2008 -282 -2010 0
 2006  2007  2008 -282  2011 0

c  1+1 --> 2
c    (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0 ∧  p_282) -> (-b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0)
c  in CNF:
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_2
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨  b^{1, 283}_1
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ -p_282 ∨ -b^{1, 283}_0
c  in DIMACS:
 2006  2007 -2008 -282 -2009 0
 2006  2007 -2008 -282  2010 0
 2006  2007 -2008 -282 -2011 0

c  2+1 --> break 
c    (-b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧  p_282) -> break
c  in CNF:
c     b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 2006 -2007  2008 -282 1162 0


c  2-1 --> 1
c    (-b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧ -p_282) -> (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0)
c  in CNF:
c     b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_2
c     b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_1
c     b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨  b^{1, 283}_0
c  in DIMACS:
 2006 -2007  2008  282 -2009 0
 2006 -2007  2008  282 -2010 0
 2006 -2007  2008  282  2011 0

c  1-1 --> 0
c    (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0 ∧ -p_282) -> (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧ -b^{1, 283}_0)
c  in CNF:
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_2
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_1
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_0
c  in DIMACS:
 2006  2007 -2008  282 -2009 0
 2006  2007 -2008  282 -2010 0
 2006  2007 -2008  282 -2011 0

c  0-1 --> -1
c    (-b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧ -p_282) -> ( b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0)
c  in CNF:
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨  b^{1, 283}_2
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_1
c     b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨  b^{1, 283}_0
c  in DIMACS:
 2006  2007  2008  282  2009 0
 2006  2007  2008  282 -2010 0
 2006  2007  2008  282  2011 0

c  -1-1 --> -2
c    ( b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧  b^{1, 282}_0 ∧ -p_282) -> ( b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0)
c  in CNF:
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨  b^{1, 283}_2
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨  b^{1, 283}_1
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨  p_282 ∨ -b^{1, 283}_0
c  in DIMACS:
-2006  2007 -2008  282  2009 0
-2006  2007 -2008  282  2010 0
-2006  2007 -2008  282 -2011 0

c  -2-1 --> break 
c    ( b^{1, 282}_2 ∧  b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨  b^{1, 282}_0 ∨  p_282 ∨ break
c  in DIMACS:
-2006 -2007  2008  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 282}_2 ∧ -b^{1, 282}_1 ∧ -b^{1, 282}_0 ∧ true) 
c  in CNF:
c    -b^{1, 282}_2 ∨  b^{1, 282}_1 ∨  b^{1, 282}_0 ∨ false 
c  in DIMACS:
-2006  2007  2008  0

c  3 does not represent an automaton state.
c    -(-b^{1, 282}_2 ∧  b^{1, 282}_1 ∧  b^{1, 282}_0 ∧ true) 
c  in CNF:
c     b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ false 
c  in DIMACS:
 2006 -2007 -2008  0
c  -3 does not represent an automaton state.
c    -( b^{1, 282}_2 ∧  b^{1, 282}_1 ∧  b^{1, 282}_0 ∧ true) 
c  in CNF:
c    -b^{1, 282}_2 ∨ -b^{1, 282}_1 ∨ -b^{1, 282}_0 ∨ false 
c  in DIMACS:
-2006 -2007 -2008  0

c i = 283
c  -2+1 --> -1
c    ( b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧  p_283) -> ( b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0)
c  in CNF:
c    -b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨  b^{1, 284}_2
c    -b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_1
c    -b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨  b^{1, 284}_0
c  in DIMACS:
-2009 -2010  2011 -283  2012 0
-2009 -2010  2011 -283 -2013 0
-2009 -2010  2011 -283  2014 0

c  -1+1 --> 0
c    ( b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0 ∧  p_283) -> (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧ -b^{1, 284}_0)
c  in CNF:
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_2
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_1
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_0
c  in DIMACS:
-2009  2010 -2011 -283 -2012 0
-2009  2010 -2011 -283 -2013 0
-2009  2010 -2011 -283 -2014 0

c  0+1 --> 1
c    (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧  p_283) -> (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0)
c  in CNF:
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_2
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_1
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨  b^{1, 284}_0
c  in DIMACS:
 2009  2010  2011 -283 -2012 0
 2009  2010  2011 -283 -2013 0
 2009  2010  2011 -283  2014 0

c  1+1 --> 2
c    (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0 ∧  p_283) -> (-b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0)
c  in CNF:
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_2
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨  b^{1, 284}_1
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ -p_283 ∨ -b^{1, 284}_0
c  in DIMACS:
 2009  2010 -2011 -283 -2012 0
 2009  2010 -2011 -283  2013 0
 2009  2010 -2011 -283 -2014 0

c  2+1 --> break 
c    (-b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧  p_283) -> break
c  in CNF:
c     b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ -p_283 ∨ break
c  in DIMACS:
 2009 -2010  2011 -283 1162 0


c  2-1 --> 1
c    (-b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧ -p_283) -> (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0)
c  in CNF:
c     b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_2
c     b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_1
c     b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨  b^{1, 284}_0
c  in DIMACS:
 2009 -2010  2011  283 -2012 0
 2009 -2010  2011  283 -2013 0
 2009 -2010  2011  283  2014 0

c  1-1 --> 0
c    (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0 ∧ -p_283) -> (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧ -b^{1, 284}_0)
c  in CNF:
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_2
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_1
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_0
c  in DIMACS:
 2009  2010 -2011  283 -2012 0
 2009  2010 -2011  283 -2013 0
 2009  2010 -2011  283 -2014 0

c  0-1 --> -1
c    (-b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧ -p_283) -> ( b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0)
c  in CNF:
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨  b^{1, 284}_2
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_1
c     b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨  b^{1, 284}_0
c  in DIMACS:
 2009  2010  2011  283  2012 0
 2009  2010  2011  283 -2013 0
 2009  2010  2011  283  2014 0

c  -1-1 --> -2
c    ( b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧  b^{1, 283}_0 ∧ -p_283) -> ( b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0)
c  in CNF:
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨  b^{1, 284}_2
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨  b^{1, 284}_1
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨  p_283 ∨ -b^{1, 284}_0
c  in DIMACS:
-2009  2010 -2011  283  2012 0
-2009  2010 -2011  283  2013 0
-2009  2010 -2011  283 -2014 0

c  -2-1 --> break 
c    ( b^{1, 283}_2 ∧  b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧ -p_283) -> break
c  in CNF:
c    -b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨  b^{1, 283}_0 ∨  p_283 ∨ break
c  in DIMACS:
-2009 -2010  2011  283 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 283}_2 ∧ -b^{1, 283}_1 ∧ -b^{1, 283}_0 ∧ true) 
c  in CNF:
c    -b^{1, 283}_2 ∨  b^{1, 283}_1 ∨  b^{1, 283}_0 ∨ false 
c  in DIMACS:
-2009  2010  2011  0

c  3 does not represent an automaton state.
c    -(-b^{1, 283}_2 ∧  b^{1, 283}_1 ∧  b^{1, 283}_0 ∧ true) 
c  in CNF:
c     b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ false 
c  in DIMACS:
 2009 -2010 -2011  0
c  -3 does not represent an automaton state.
c    -( b^{1, 283}_2 ∧  b^{1, 283}_1 ∧  b^{1, 283}_0 ∧ true) 
c  in CNF:
c    -b^{1, 283}_2 ∨ -b^{1, 283}_1 ∨ -b^{1, 283}_0 ∨ false 
c  in DIMACS:
-2009 -2010 -2011  0

c i = 284
c  -2+1 --> -1
c    ( b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧  p_284) -> ( b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0)
c  in CNF:
c    -b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨  b^{1, 285}_2
c    -b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_1
c    -b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨  b^{1, 285}_0
c  in DIMACS:
-2012 -2013  2014 -284  2015 0
-2012 -2013  2014 -284 -2016 0
-2012 -2013  2014 -284  2017 0

c  -1+1 --> 0
c    ( b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0 ∧  p_284) -> (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧ -b^{1, 285}_0)
c  in CNF:
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_2
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_1
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_0
c  in DIMACS:
-2012  2013 -2014 -284 -2015 0
-2012  2013 -2014 -284 -2016 0
-2012  2013 -2014 -284 -2017 0

c  0+1 --> 1
c    (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧  p_284) -> (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0)
c  in CNF:
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_2
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_1
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨  b^{1, 285}_0
c  in DIMACS:
 2012  2013  2014 -284 -2015 0
 2012  2013  2014 -284 -2016 0
 2012  2013  2014 -284  2017 0

c  1+1 --> 2
c    (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0 ∧  p_284) -> (-b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0)
c  in CNF:
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_2
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨  b^{1, 285}_1
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ -p_284 ∨ -b^{1, 285}_0
c  in DIMACS:
 2012  2013 -2014 -284 -2015 0
 2012  2013 -2014 -284  2016 0
 2012  2013 -2014 -284 -2017 0

c  2+1 --> break 
c    (-b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧  p_284) -> break
c  in CNF:
c     b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 2012 -2013  2014 -284 1162 0


c  2-1 --> 1
c    (-b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧ -p_284) -> (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0)
c  in CNF:
c     b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_2
c     b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_1
c     b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨  b^{1, 285}_0
c  in DIMACS:
 2012 -2013  2014  284 -2015 0
 2012 -2013  2014  284 -2016 0
 2012 -2013  2014  284  2017 0

c  1-1 --> 0
c    (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0 ∧ -p_284) -> (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧ -b^{1, 285}_0)
c  in CNF:
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_2
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_1
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_0
c  in DIMACS:
 2012  2013 -2014  284 -2015 0
 2012  2013 -2014  284 -2016 0
 2012  2013 -2014  284 -2017 0

c  0-1 --> -1
c    (-b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧ -p_284) -> ( b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0)
c  in CNF:
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨  b^{1, 285}_2
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_1
c     b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨  b^{1, 285}_0
c  in DIMACS:
 2012  2013  2014  284  2015 0
 2012  2013  2014  284 -2016 0
 2012  2013  2014  284  2017 0

c  -1-1 --> -2
c    ( b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧  b^{1, 284}_0 ∧ -p_284) -> ( b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0)
c  in CNF:
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨  b^{1, 285}_2
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨  b^{1, 285}_1
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨  p_284 ∨ -b^{1, 285}_0
c  in DIMACS:
-2012  2013 -2014  284  2015 0
-2012  2013 -2014  284  2016 0
-2012  2013 -2014  284 -2017 0

c  -2-1 --> break 
c    ( b^{1, 284}_2 ∧  b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨  b^{1, 284}_0 ∨  p_284 ∨ break
c  in DIMACS:
-2012 -2013  2014  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 284}_2 ∧ -b^{1, 284}_1 ∧ -b^{1, 284}_0 ∧ true) 
c  in CNF:
c    -b^{1, 284}_2 ∨  b^{1, 284}_1 ∨  b^{1, 284}_0 ∨ false 
c  in DIMACS:
-2012  2013  2014  0

c  3 does not represent an automaton state.
c    -(-b^{1, 284}_2 ∧  b^{1, 284}_1 ∧  b^{1, 284}_0 ∧ true) 
c  in CNF:
c     b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ false 
c  in DIMACS:
 2012 -2013 -2014  0
c  -3 does not represent an automaton state.
c    -( b^{1, 284}_2 ∧  b^{1, 284}_1 ∧  b^{1, 284}_0 ∧ true) 
c  in CNF:
c    -b^{1, 284}_2 ∨ -b^{1, 284}_1 ∨ -b^{1, 284}_0 ∨ false 
c  in DIMACS:
-2012 -2013 -2014  0

c i = 285
c  -2+1 --> -1
c    ( b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧  p_285) -> ( b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0)
c  in CNF:
c    -b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨  b^{1, 286}_2
c    -b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_1
c    -b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨  b^{1, 286}_0
c  in DIMACS:
-2015 -2016  2017 -285  2018 0
-2015 -2016  2017 -285 -2019 0
-2015 -2016  2017 -285  2020 0

c  -1+1 --> 0
c    ( b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0 ∧  p_285) -> (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧ -b^{1, 286}_0)
c  in CNF:
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_2
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_1
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_0
c  in DIMACS:
-2015  2016 -2017 -285 -2018 0
-2015  2016 -2017 -285 -2019 0
-2015  2016 -2017 -285 -2020 0

c  0+1 --> 1
c    (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧  p_285) -> (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0)
c  in CNF:
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_2
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_1
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨  b^{1, 286}_0
c  in DIMACS:
 2015  2016  2017 -285 -2018 0
 2015  2016  2017 -285 -2019 0
 2015  2016  2017 -285  2020 0

c  1+1 --> 2
c    (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0 ∧  p_285) -> (-b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0)
c  in CNF:
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_2
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨  b^{1, 286}_1
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ -p_285 ∨ -b^{1, 286}_0
c  in DIMACS:
 2015  2016 -2017 -285 -2018 0
 2015  2016 -2017 -285  2019 0
 2015  2016 -2017 -285 -2020 0

c  2+1 --> break 
c    (-b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧  p_285) -> break
c  in CNF:
c     b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 2015 -2016  2017 -285 1162 0


c  2-1 --> 1
c    (-b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧ -p_285) -> (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0)
c  in CNF:
c     b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_2
c     b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_1
c     b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨  b^{1, 286}_0
c  in DIMACS:
 2015 -2016  2017  285 -2018 0
 2015 -2016  2017  285 -2019 0
 2015 -2016  2017  285  2020 0

c  1-1 --> 0
c    (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0 ∧ -p_285) -> (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧ -b^{1, 286}_0)
c  in CNF:
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_2
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_1
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_0
c  in DIMACS:
 2015  2016 -2017  285 -2018 0
 2015  2016 -2017  285 -2019 0
 2015  2016 -2017  285 -2020 0

c  0-1 --> -1
c    (-b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧ -p_285) -> ( b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0)
c  in CNF:
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨  b^{1, 286}_2
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_1
c     b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨  b^{1, 286}_0
c  in DIMACS:
 2015  2016  2017  285  2018 0
 2015  2016  2017  285 -2019 0
 2015  2016  2017  285  2020 0

c  -1-1 --> -2
c    ( b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧  b^{1, 285}_0 ∧ -p_285) -> ( b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0)
c  in CNF:
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨  b^{1, 286}_2
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨  b^{1, 286}_1
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨  p_285 ∨ -b^{1, 286}_0
c  in DIMACS:
-2015  2016 -2017  285  2018 0
-2015  2016 -2017  285  2019 0
-2015  2016 -2017  285 -2020 0

c  -2-1 --> break 
c    ( b^{1, 285}_2 ∧  b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨  b^{1, 285}_0 ∨  p_285 ∨ break
c  in DIMACS:
-2015 -2016  2017  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 285}_2 ∧ -b^{1, 285}_1 ∧ -b^{1, 285}_0 ∧ true) 
c  in CNF:
c    -b^{1, 285}_2 ∨  b^{1, 285}_1 ∨  b^{1, 285}_0 ∨ false 
c  in DIMACS:
-2015  2016  2017  0

c  3 does not represent an automaton state.
c    -(-b^{1, 285}_2 ∧  b^{1, 285}_1 ∧  b^{1, 285}_0 ∧ true) 
c  in CNF:
c     b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ false 
c  in DIMACS:
 2015 -2016 -2017  0
c  -3 does not represent an automaton state.
c    -( b^{1, 285}_2 ∧  b^{1, 285}_1 ∧  b^{1, 285}_0 ∧ true) 
c  in CNF:
c    -b^{1, 285}_2 ∨ -b^{1, 285}_1 ∨ -b^{1, 285}_0 ∨ false 
c  in DIMACS:
-2015 -2016 -2017  0

c i = 286
c  -2+1 --> -1
c    ( b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧  p_286) -> ( b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0)
c  in CNF:
c    -b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨  b^{1, 287}_2
c    -b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_1
c    -b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨  b^{1, 287}_0
c  in DIMACS:
-2018 -2019  2020 -286  2021 0
-2018 -2019  2020 -286 -2022 0
-2018 -2019  2020 -286  2023 0

c  -1+1 --> 0
c    ( b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0 ∧  p_286) -> (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧ -b^{1, 287}_0)
c  in CNF:
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_2
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_1
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_0
c  in DIMACS:
-2018  2019 -2020 -286 -2021 0
-2018  2019 -2020 -286 -2022 0
-2018  2019 -2020 -286 -2023 0

c  0+1 --> 1
c    (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧  p_286) -> (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0)
c  in CNF:
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_2
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_1
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨  b^{1, 287}_0
c  in DIMACS:
 2018  2019  2020 -286 -2021 0
 2018  2019  2020 -286 -2022 0
 2018  2019  2020 -286  2023 0

c  1+1 --> 2
c    (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0 ∧  p_286) -> (-b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0)
c  in CNF:
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_2
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨  b^{1, 287}_1
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ -p_286 ∨ -b^{1, 287}_0
c  in DIMACS:
 2018  2019 -2020 -286 -2021 0
 2018  2019 -2020 -286  2022 0
 2018  2019 -2020 -286 -2023 0

c  2+1 --> break 
c    (-b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧  p_286) -> break
c  in CNF:
c     b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 2018 -2019  2020 -286 1162 0


c  2-1 --> 1
c    (-b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧ -p_286) -> (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0)
c  in CNF:
c     b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_2
c     b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_1
c     b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨  b^{1, 287}_0
c  in DIMACS:
 2018 -2019  2020  286 -2021 0
 2018 -2019  2020  286 -2022 0
 2018 -2019  2020  286  2023 0

c  1-1 --> 0
c    (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0 ∧ -p_286) -> (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧ -b^{1, 287}_0)
c  in CNF:
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_2
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_1
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_0
c  in DIMACS:
 2018  2019 -2020  286 -2021 0
 2018  2019 -2020  286 -2022 0
 2018  2019 -2020  286 -2023 0

c  0-1 --> -1
c    (-b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧ -p_286) -> ( b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0)
c  in CNF:
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨  b^{1, 287}_2
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_1
c     b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨  b^{1, 287}_0
c  in DIMACS:
 2018  2019  2020  286  2021 0
 2018  2019  2020  286 -2022 0
 2018  2019  2020  286  2023 0

c  -1-1 --> -2
c    ( b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧  b^{1, 286}_0 ∧ -p_286) -> ( b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0)
c  in CNF:
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨  b^{1, 287}_2
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨  b^{1, 287}_1
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨  p_286 ∨ -b^{1, 287}_0
c  in DIMACS:
-2018  2019 -2020  286  2021 0
-2018  2019 -2020  286  2022 0
-2018  2019 -2020  286 -2023 0

c  -2-1 --> break 
c    ( b^{1, 286}_2 ∧  b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨  b^{1, 286}_0 ∨  p_286 ∨ break
c  in DIMACS:
-2018 -2019  2020  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 286}_2 ∧ -b^{1, 286}_1 ∧ -b^{1, 286}_0 ∧ true) 
c  in CNF:
c    -b^{1, 286}_2 ∨  b^{1, 286}_1 ∨  b^{1, 286}_0 ∨ false 
c  in DIMACS:
-2018  2019  2020  0

c  3 does not represent an automaton state.
c    -(-b^{1, 286}_2 ∧  b^{1, 286}_1 ∧  b^{1, 286}_0 ∧ true) 
c  in CNF:
c     b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ false 
c  in DIMACS:
 2018 -2019 -2020  0
c  -3 does not represent an automaton state.
c    -( b^{1, 286}_2 ∧  b^{1, 286}_1 ∧  b^{1, 286}_0 ∧ true) 
c  in CNF:
c    -b^{1, 286}_2 ∨ -b^{1, 286}_1 ∨ -b^{1, 286}_0 ∨ false 
c  in DIMACS:
-2018 -2019 -2020  0

c i = 287
c  -2+1 --> -1
c    ( b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧  p_287) -> ( b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0)
c  in CNF:
c    -b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨  b^{1, 288}_2
c    -b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_1
c    -b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨  b^{1, 288}_0
c  in DIMACS:
-2021 -2022  2023 -287  2024 0
-2021 -2022  2023 -287 -2025 0
-2021 -2022  2023 -287  2026 0

c  -1+1 --> 0
c    ( b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0 ∧  p_287) -> (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧ -b^{1, 288}_0)
c  in CNF:
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_2
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_1
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_0
c  in DIMACS:
-2021  2022 -2023 -287 -2024 0
-2021  2022 -2023 -287 -2025 0
-2021  2022 -2023 -287 -2026 0

c  0+1 --> 1
c    (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧  p_287) -> (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0)
c  in CNF:
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_2
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_1
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨  b^{1, 288}_0
c  in DIMACS:
 2021  2022  2023 -287 -2024 0
 2021  2022  2023 -287 -2025 0
 2021  2022  2023 -287  2026 0

c  1+1 --> 2
c    (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0 ∧  p_287) -> (-b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0)
c  in CNF:
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_2
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨  b^{1, 288}_1
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ -p_287 ∨ -b^{1, 288}_0
c  in DIMACS:
 2021  2022 -2023 -287 -2024 0
 2021  2022 -2023 -287  2025 0
 2021  2022 -2023 -287 -2026 0

c  2+1 --> break 
c    (-b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧  p_287) -> break
c  in CNF:
c     b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ -p_287 ∨ break
c  in DIMACS:
 2021 -2022  2023 -287 1162 0


c  2-1 --> 1
c    (-b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧ -p_287) -> (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0)
c  in CNF:
c     b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_2
c     b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_1
c     b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨  b^{1, 288}_0
c  in DIMACS:
 2021 -2022  2023  287 -2024 0
 2021 -2022  2023  287 -2025 0
 2021 -2022  2023  287  2026 0

c  1-1 --> 0
c    (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0 ∧ -p_287) -> (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧ -b^{1, 288}_0)
c  in CNF:
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_2
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_1
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_0
c  in DIMACS:
 2021  2022 -2023  287 -2024 0
 2021  2022 -2023  287 -2025 0
 2021  2022 -2023  287 -2026 0

c  0-1 --> -1
c    (-b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧ -p_287) -> ( b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0)
c  in CNF:
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨  b^{1, 288}_2
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_1
c     b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨  b^{1, 288}_0
c  in DIMACS:
 2021  2022  2023  287  2024 0
 2021  2022  2023  287 -2025 0
 2021  2022  2023  287  2026 0

c  -1-1 --> -2
c    ( b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧  b^{1, 287}_0 ∧ -p_287) -> ( b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0)
c  in CNF:
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨  b^{1, 288}_2
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨  b^{1, 288}_1
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨  p_287 ∨ -b^{1, 288}_0
c  in DIMACS:
-2021  2022 -2023  287  2024 0
-2021  2022 -2023  287  2025 0
-2021  2022 -2023  287 -2026 0

c  -2-1 --> break 
c    ( b^{1, 287}_2 ∧  b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧ -p_287) -> break
c  in CNF:
c    -b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨  b^{1, 287}_0 ∨  p_287 ∨ break
c  in DIMACS:
-2021 -2022  2023  287 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 287}_2 ∧ -b^{1, 287}_1 ∧ -b^{1, 287}_0 ∧ true) 
c  in CNF:
c    -b^{1, 287}_2 ∨  b^{1, 287}_1 ∨  b^{1, 287}_0 ∨ false 
c  in DIMACS:
-2021  2022  2023  0

c  3 does not represent an automaton state.
c    -(-b^{1, 287}_2 ∧  b^{1, 287}_1 ∧  b^{1, 287}_0 ∧ true) 
c  in CNF:
c     b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ false 
c  in DIMACS:
 2021 -2022 -2023  0
c  -3 does not represent an automaton state.
c    -( b^{1, 287}_2 ∧  b^{1, 287}_1 ∧  b^{1, 287}_0 ∧ true) 
c  in CNF:
c    -b^{1, 287}_2 ∨ -b^{1, 287}_1 ∨ -b^{1, 287}_0 ∨ false 
c  in DIMACS:
-2021 -2022 -2023  0

c i = 288
c  -2+1 --> -1
c    ( b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧  p_288) -> ( b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0)
c  in CNF:
c    -b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨  b^{1, 289}_2
c    -b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_1
c    -b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨  b^{1, 289}_0
c  in DIMACS:
-2024 -2025  2026 -288  2027 0
-2024 -2025  2026 -288 -2028 0
-2024 -2025  2026 -288  2029 0

c  -1+1 --> 0
c    ( b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0 ∧  p_288) -> (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧ -b^{1, 289}_0)
c  in CNF:
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_2
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_1
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_0
c  in DIMACS:
-2024  2025 -2026 -288 -2027 0
-2024  2025 -2026 -288 -2028 0
-2024  2025 -2026 -288 -2029 0

c  0+1 --> 1
c    (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧  p_288) -> (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0)
c  in CNF:
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_2
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_1
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨  b^{1, 289}_0
c  in DIMACS:
 2024  2025  2026 -288 -2027 0
 2024  2025  2026 -288 -2028 0
 2024  2025  2026 -288  2029 0

c  1+1 --> 2
c    (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0 ∧  p_288) -> (-b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0)
c  in CNF:
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_2
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨  b^{1, 289}_1
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ -p_288 ∨ -b^{1, 289}_0
c  in DIMACS:
 2024  2025 -2026 -288 -2027 0
 2024  2025 -2026 -288  2028 0
 2024  2025 -2026 -288 -2029 0

c  2+1 --> break 
c    (-b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧  p_288) -> break
c  in CNF:
c     b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 2024 -2025  2026 -288 1162 0


c  2-1 --> 1
c    (-b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧ -p_288) -> (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0)
c  in CNF:
c     b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_2
c     b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_1
c     b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨  b^{1, 289}_0
c  in DIMACS:
 2024 -2025  2026  288 -2027 0
 2024 -2025  2026  288 -2028 0
 2024 -2025  2026  288  2029 0

c  1-1 --> 0
c    (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0 ∧ -p_288) -> (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧ -b^{1, 289}_0)
c  in CNF:
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_2
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_1
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_0
c  in DIMACS:
 2024  2025 -2026  288 -2027 0
 2024  2025 -2026  288 -2028 0
 2024  2025 -2026  288 -2029 0

c  0-1 --> -1
c    (-b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧ -p_288) -> ( b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0)
c  in CNF:
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨  b^{1, 289}_2
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_1
c     b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨  b^{1, 289}_0
c  in DIMACS:
 2024  2025  2026  288  2027 0
 2024  2025  2026  288 -2028 0
 2024  2025  2026  288  2029 0

c  -1-1 --> -2
c    ( b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧  b^{1, 288}_0 ∧ -p_288) -> ( b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0)
c  in CNF:
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨  b^{1, 289}_2
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨  b^{1, 289}_1
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨  p_288 ∨ -b^{1, 289}_0
c  in DIMACS:
-2024  2025 -2026  288  2027 0
-2024  2025 -2026  288  2028 0
-2024  2025 -2026  288 -2029 0

c  -2-1 --> break 
c    ( b^{1, 288}_2 ∧  b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨  b^{1, 288}_0 ∨  p_288 ∨ break
c  in DIMACS:
-2024 -2025  2026  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 288}_2 ∧ -b^{1, 288}_1 ∧ -b^{1, 288}_0 ∧ true) 
c  in CNF:
c    -b^{1, 288}_2 ∨  b^{1, 288}_1 ∨  b^{1, 288}_0 ∨ false 
c  in DIMACS:
-2024  2025  2026  0

c  3 does not represent an automaton state.
c    -(-b^{1, 288}_2 ∧  b^{1, 288}_1 ∧  b^{1, 288}_0 ∧ true) 
c  in CNF:
c     b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ false 
c  in DIMACS:
 2024 -2025 -2026  0
c  -3 does not represent an automaton state.
c    -( b^{1, 288}_2 ∧  b^{1, 288}_1 ∧  b^{1, 288}_0 ∧ true) 
c  in CNF:
c    -b^{1, 288}_2 ∨ -b^{1, 288}_1 ∨ -b^{1, 288}_0 ∨ false 
c  in DIMACS:
-2024 -2025 -2026  0

c i = 289
c  -2+1 --> -1
c    ( b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧  p_289) -> ( b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0)
c  in CNF:
c    -b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨  b^{1, 290}_2
c    -b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_1
c    -b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨  b^{1, 290}_0
c  in DIMACS:
-2027 -2028  2029 -289  2030 0
-2027 -2028  2029 -289 -2031 0
-2027 -2028  2029 -289  2032 0

c  -1+1 --> 0
c    ( b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0 ∧  p_289) -> (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧ -b^{1, 290}_0)
c  in CNF:
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_2
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_1
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_0
c  in DIMACS:
-2027  2028 -2029 -289 -2030 0
-2027  2028 -2029 -289 -2031 0
-2027  2028 -2029 -289 -2032 0

c  0+1 --> 1
c    (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧  p_289) -> (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0)
c  in CNF:
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_2
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_1
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨  b^{1, 290}_0
c  in DIMACS:
 2027  2028  2029 -289 -2030 0
 2027  2028  2029 -289 -2031 0
 2027  2028  2029 -289  2032 0

c  1+1 --> 2
c    (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0 ∧  p_289) -> (-b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0)
c  in CNF:
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_2
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨  b^{1, 290}_1
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ -p_289 ∨ -b^{1, 290}_0
c  in DIMACS:
 2027  2028 -2029 -289 -2030 0
 2027  2028 -2029 -289  2031 0
 2027  2028 -2029 -289 -2032 0

c  2+1 --> break 
c    (-b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧  p_289) -> break
c  in CNF:
c     b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ -p_289 ∨ break
c  in DIMACS:
 2027 -2028  2029 -289 1162 0


c  2-1 --> 1
c    (-b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧ -p_289) -> (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0)
c  in CNF:
c     b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_2
c     b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_1
c     b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨  b^{1, 290}_0
c  in DIMACS:
 2027 -2028  2029  289 -2030 0
 2027 -2028  2029  289 -2031 0
 2027 -2028  2029  289  2032 0

c  1-1 --> 0
c    (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0 ∧ -p_289) -> (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧ -b^{1, 290}_0)
c  in CNF:
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_2
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_1
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_0
c  in DIMACS:
 2027  2028 -2029  289 -2030 0
 2027  2028 -2029  289 -2031 0
 2027  2028 -2029  289 -2032 0

c  0-1 --> -1
c    (-b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧ -p_289) -> ( b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0)
c  in CNF:
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨  b^{1, 290}_2
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_1
c     b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨  b^{1, 290}_0
c  in DIMACS:
 2027  2028  2029  289  2030 0
 2027  2028  2029  289 -2031 0
 2027  2028  2029  289  2032 0

c  -1-1 --> -2
c    ( b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧  b^{1, 289}_0 ∧ -p_289) -> ( b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0)
c  in CNF:
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨  b^{1, 290}_2
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨  b^{1, 290}_1
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨  p_289 ∨ -b^{1, 290}_0
c  in DIMACS:
-2027  2028 -2029  289  2030 0
-2027  2028 -2029  289  2031 0
-2027  2028 -2029  289 -2032 0

c  -2-1 --> break 
c    ( b^{1, 289}_2 ∧  b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧ -p_289) -> break
c  in CNF:
c    -b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨  b^{1, 289}_0 ∨  p_289 ∨ break
c  in DIMACS:
-2027 -2028  2029  289 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 289}_2 ∧ -b^{1, 289}_1 ∧ -b^{1, 289}_0 ∧ true) 
c  in CNF:
c    -b^{1, 289}_2 ∨  b^{1, 289}_1 ∨  b^{1, 289}_0 ∨ false 
c  in DIMACS:
-2027  2028  2029  0

c  3 does not represent an automaton state.
c    -(-b^{1, 289}_2 ∧  b^{1, 289}_1 ∧  b^{1, 289}_0 ∧ true) 
c  in CNF:
c     b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ false 
c  in DIMACS:
 2027 -2028 -2029  0
c  -3 does not represent an automaton state.
c    -( b^{1, 289}_2 ∧  b^{1, 289}_1 ∧  b^{1, 289}_0 ∧ true) 
c  in CNF:
c    -b^{1, 289}_2 ∨ -b^{1, 289}_1 ∨ -b^{1, 289}_0 ∨ false 
c  in DIMACS:
-2027 -2028 -2029  0

c i = 290
c  -2+1 --> -1
c    ( b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧  p_290) -> ( b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0)
c  in CNF:
c    -b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨  b^{1, 291}_2
c    -b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_1
c    -b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨  b^{1, 291}_0
c  in DIMACS:
-2030 -2031  2032 -290  2033 0
-2030 -2031  2032 -290 -2034 0
-2030 -2031  2032 -290  2035 0

c  -1+1 --> 0
c    ( b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0 ∧  p_290) -> (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧ -b^{1, 291}_0)
c  in CNF:
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_2
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_1
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_0
c  in DIMACS:
-2030  2031 -2032 -290 -2033 0
-2030  2031 -2032 -290 -2034 0
-2030  2031 -2032 -290 -2035 0

c  0+1 --> 1
c    (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧  p_290) -> (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0)
c  in CNF:
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_2
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_1
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨  b^{1, 291}_0
c  in DIMACS:
 2030  2031  2032 -290 -2033 0
 2030  2031  2032 -290 -2034 0
 2030  2031  2032 -290  2035 0

c  1+1 --> 2
c    (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0 ∧  p_290) -> (-b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0)
c  in CNF:
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_2
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨  b^{1, 291}_1
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ -p_290 ∨ -b^{1, 291}_0
c  in DIMACS:
 2030  2031 -2032 -290 -2033 0
 2030  2031 -2032 -290  2034 0
 2030  2031 -2032 -290 -2035 0

c  2+1 --> break 
c    (-b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧  p_290) -> break
c  in CNF:
c     b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 2030 -2031  2032 -290 1162 0


c  2-1 --> 1
c    (-b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧ -p_290) -> (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0)
c  in CNF:
c     b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_2
c     b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_1
c     b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨  b^{1, 291}_0
c  in DIMACS:
 2030 -2031  2032  290 -2033 0
 2030 -2031  2032  290 -2034 0
 2030 -2031  2032  290  2035 0

c  1-1 --> 0
c    (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0 ∧ -p_290) -> (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧ -b^{1, 291}_0)
c  in CNF:
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_2
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_1
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_0
c  in DIMACS:
 2030  2031 -2032  290 -2033 0
 2030  2031 -2032  290 -2034 0
 2030  2031 -2032  290 -2035 0

c  0-1 --> -1
c    (-b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧ -p_290) -> ( b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0)
c  in CNF:
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨  b^{1, 291}_2
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_1
c     b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨  b^{1, 291}_0
c  in DIMACS:
 2030  2031  2032  290  2033 0
 2030  2031  2032  290 -2034 0
 2030  2031  2032  290  2035 0

c  -1-1 --> -2
c    ( b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧  b^{1, 290}_0 ∧ -p_290) -> ( b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0)
c  in CNF:
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨  b^{1, 291}_2
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨  b^{1, 291}_1
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨  p_290 ∨ -b^{1, 291}_0
c  in DIMACS:
-2030  2031 -2032  290  2033 0
-2030  2031 -2032  290  2034 0
-2030  2031 -2032  290 -2035 0

c  -2-1 --> break 
c    ( b^{1, 290}_2 ∧  b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨  b^{1, 290}_0 ∨  p_290 ∨ break
c  in DIMACS:
-2030 -2031  2032  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 290}_2 ∧ -b^{1, 290}_1 ∧ -b^{1, 290}_0 ∧ true) 
c  in CNF:
c    -b^{1, 290}_2 ∨  b^{1, 290}_1 ∨  b^{1, 290}_0 ∨ false 
c  in DIMACS:
-2030  2031  2032  0

c  3 does not represent an automaton state.
c    -(-b^{1, 290}_2 ∧  b^{1, 290}_1 ∧  b^{1, 290}_0 ∧ true) 
c  in CNF:
c     b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ false 
c  in DIMACS:
 2030 -2031 -2032  0
c  -3 does not represent an automaton state.
c    -( b^{1, 290}_2 ∧  b^{1, 290}_1 ∧  b^{1, 290}_0 ∧ true) 
c  in CNF:
c    -b^{1, 290}_2 ∨ -b^{1, 290}_1 ∨ -b^{1, 290}_0 ∨ false 
c  in DIMACS:
-2030 -2031 -2032  0

c i = 291
c  -2+1 --> -1
c    ( b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧  p_291) -> ( b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0)
c  in CNF:
c    -b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨  b^{1, 292}_2
c    -b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_1
c    -b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨  b^{1, 292}_0
c  in DIMACS:
-2033 -2034  2035 -291  2036 0
-2033 -2034  2035 -291 -2037 0
-2033 -2034  2035 -291  2038 0

c  -1+1 --> 0
c    ( b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0 ∧  p_291) -> (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧ -b^{1, 292}_0)
c  in CNF:
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_2
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_1
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_0
c  in DIMACS:
-2033  2034 -2035 -291 -2036 0
-2033  2034 -2035 -291 -2037 0
-2033  2034 -2035 -291 -2038 0

c  0+1 --> 1
c    (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧  p_291) -> (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0)
c  in CNF:
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_2
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_1
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨  b^{1, 292}_0
c  in DIMACS:
 2033  2034  2035 -291 -2036 0
 2033  2034  2035 -291 -2037 0
 2033  2034  2035 -291  2038 0

c  1+1 --> 2
c    (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0 ∧  p_291) -> (-b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0)
c  in CNF:
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_2
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨  b^{1, 292}_1
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ -p_291 ∨ -b^{1, 292}_0
c  in DIMACS:
 2033  2034 -2035 -291 -2036 0
 2033  2034 -2035 -291  2037 0
 2033  2034 -2035 -291 -2038 0

c  2+1 --> break 
c    (-b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧  p_291) -> break
c  in CNF:
c     b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ -p_291 ∨ break
c  in DIMACS:
 2033 -2034  2035 -291 1162 0


c  2-1 --> 1
c    (-b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧ -p_291) -> (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0)
c  in CNF:
c     b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_2
c     b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_1
c     b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨  b^{1, 292}_0
c  in DIMACS:
 2033 -2034  2035  291 -2036 0
 2033 -2034  2035  291 -2037 0
 2033 -2034  2035  291  2038 0

c  1-1 --> 0
c    (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0 ∧ -p_291) -> (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧ -b^{1, 292}_0)
c  in CNF:
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_2
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_1
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_0
c  in DIMACS:
 2033  2034 -2035  291 -2036 0
 2033  2034 -2035  291 -2037 0
 2033  2034 -2035  291 -2038 0

c  0-1 --> -1
c    (-b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧ -p_291) -> ( b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0)
c  in CNF:
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨  b^{1, 292}_2
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_1
c     b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨  b^{1, 292}_0
c  in DIMACS:
 2033  2034  2035  291  2036 0
 2033  2034  2035  291 -2037 0
 2033  2034  2035  291  2038 0

c  -1-1 --> -2
c    ( b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧  b^{1, 291}_0 ∧ -p_291) -> ( b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0)
c  in CNF:
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨  b^{1, 292}_2
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨  b^{1, 292}_1
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨  p_291 ∨ -b^{1, 292}_0
c  in DIMACS:
-2033  2034 -2035  291  2036 0
-2033  2034 -2035  291  2037 0
-2033  2034 -2035  291 -2038 0

c  -2-1 --> break 
c    ( b^{1, 291}_2 ∧  b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧ -p_291) -> break
c  in CNF:
c    -b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨  b^{1, 291}_0 ∨  p_291 ∨ break
c  in DIMACS:
-2033 -2034  2035  291 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 291}_2 ∧ -b^{1, 291}_1 ∧ -b^{1, 291}_0 ∧ true) 
c  in CNF:
c    -b^{1, 291}_2 ∨  b^{1, 291}_1 ∨  b^{1, 291}_0 ∨ false 
c  in DIMACS:
-2033  2034  2035  0

c  3 does not represent an automaton state.
c    -(-b^{1, 291}_2 ∧  b^{1, 291}_1 ∧  b^{1, 291}_0 ∧ true) 
c  in CNF:
c     b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ false 
c  in DIMACS:
 2033 -2034 -2035  0
c  -3 does not represent an automaton state.
c    -( b^{1, 291}_2 ∧  b^{1, 291}_1 ∧  b^{1, 291}_0 ∧ true) 
c  in CNF:
c    -b^{1, 291}_2 ∨ -b^{1, 291}_1 ∨ -b^{1, 291}_0 ∨ false 
c  in DIMACS:
-2033 -2034 -2035  0

c i = 292
c  -2+1 --> -1
c    ( b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧  p_292) -> ( b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0)
c  in CNF:
c    -b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨  b^{1, 293}_2
c    -b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_1
c    -b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨  b^{1, 293}_0
c  in DIMACS:
-2036 -2037  2038 -292  2039 0
-2036 -2037  2038 -292 -2040 0
-2036 -2037  2038 -292  2041 0

c  -1+1 --> 0
c    ( b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0 ∧  p_292) -> (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧ -b^{1, 293}_0)
c  in CNF:
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_2
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_1
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_0
c  in DIMACS:
-2036  2037 -2038 -292 -2039 0
-2036  2037 -2038 -292 -2040 0
-2036  2037 -2038 -292 -2041 0

c  0+1 --> 1
c    (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧  p_292) -> (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0)
c  in CNF:
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_2
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_1
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨  b^{1, 293}_0
c  in DIMACS:
 2036  2037  2038 -292 -2039 0
 2036  2037  2038 -292 -2040 0
 2036  2037  2038 -292  2041 0

c  1+1 --> 2
c    (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0 ∧  p_292) -> (-b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0)
c  in CNF:
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_2
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨  b^{1, 293}_1
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ -p_292 ∨ -b^{1, 293}_0
c  in DIMACS:
 2036  2037 -2038 -292 -2039 0
 2036  2037 -2038 -292  2040 0
 2036  2037 -2038 -292 -2041 0

c  2+1 --> break 
c    (-b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧  p_292) -> break
c  in CNF:
c     b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 2036 -2037  2038 -292 1162 0


c  2-1 --> 1
c    (-b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧ -p_292) -> (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0)
c  in CNF:
c     b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_2
c     b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_1
c     b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨  b^{1, 293}_0
c  in DIMACS:
 2036 -2037  2038  292 -2039 0
 2036 -2037  2038  292 -2040 0
 2036 -2037  2038  292  2041 0

c  1-1 --> 0
c    (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0 ∧ -p_292) -> (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧ -b^{1, 293}_0)
c  in CNF:
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_2
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_1
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_0
c  in DIMACS:
 2036  2037 -2038  292 -2039 0
 2036  2037 -2038  292 -2040 0
 2036  2037 -2038  292 -2041 0

c  0-1 --> -1
c    (-b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧ -p_292) -> ( b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0)
c  in CNF:
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨  b^{1, 293}_2
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_1
c     b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨  b^{1, 293}_0
c  in DIMACS:
 2036  2037  2038  292  2039 0
 2036  2037  2038  292 -2040 0
 2036  2037  2038  292  2041 0

c  -1-1 --> -2
c    ( b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧  b^{1, 292}_0 ∧ -p_292) -> ( b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0)
c  in CNF:
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨  b^{1, 293}_2
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨  b^{1, 293}_1
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨  p_292 ∨ -b^{1, 293}_0
c  in DIMACS:
-2036  2037 -2038  292  2039 0
-2036  2037 -2038  292  2040 0
-2036  2037 -2038  292 -2041 0

c  -2-1 --> break 
c    ( b^{1, 292}_2 ∧  b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨  b^{1, 292}_0 ∨  p_292 ∨ break
c  in DIMACS:
-2036 -2037  2038  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 292}_2 ∧ -b^{1, 292}_1 ∧ -b^{1, 292}_0 ∧ true) 
c  in CNF:
c    -b^{1, 292}_2 ∨  b^{1, 292}_1 ∨  b^{1, 292}_0 ∨ false 
c  in DIMACS:
-2036  2037  2038  0

c  3 does not represent an automaton state.
c    -(-b^{1, 292}_2 ∧  b^{1, 292}_1 ∧  b^{1, 292}_0 ∧ true) 
c  in CNF:
c     b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ false 
c  in DIMACS:
 2036 -2037 -2038  0
c  -3 does not represent an automaton state.
c    -( b^{1, 292}_2 ∧  b^{1, 292}_1 ∧  b^{1, 292}_0 ∧ true) 
c  in CNF:
c    -b^{1, 292}_2 ∨ -b^{1, 292}_1 ∨ -b^{1, 292}_0 ∨ false 
c  in DIMACS:
-2036 -2037 -2038  0

c i = 293
c  -2+1 --> -1
c    ( b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧  p_293) -> ( b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0)
c  in CNF:
c    -b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨  b^{1, 294}_2
c    -b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_1
c    -b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨  b^{1, 294}_0
c  in DIMACS:
-2039 -2040  2041 -293  2042 0
-2039 -2040  2041 -293 -2043 0
-2039 -2040  2041 -293  2044 0

c  -1+1 --> 0
c    ( b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0 ∧  p_293) -> (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧ -b^{1, 294}_0)
c  in CNF:
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_2
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_1
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_0
c  in DIMACS:
-2039  2040 -2041 -293 -2042 0
-2039  2040 -2041 -293 -2043 0
-2039  2040 -2041 -293 -2044 0

c  0+1 --> 1
c    (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧  p_293) -> (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0)
c  in CNF:
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_2
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_1
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨  b^{1, 294}_0
c  in DIMACS:
 2039  2040  2041 -293 -2042 0
 2039  2040  2041 -293 -2043 0
 2039  2040  2041 -293  2044 0

c  1+1 --> 2
c    (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0 ∧  p_293) -> (-b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0)
c  in CNF:
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_2
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨  b^{1, 294}_1
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ -p_293 ∨ -b^{1, 294}_0
c  in DIMACS:
 2039  2040 -2041 -293 -2042 0
 2039  2040 -2041 -293  2043 0
 2039  2040 -2041 -293 -2044 0

c  2+1 --> break 
c    (-b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧  p_293) -> break
c  in CNF:
c     b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ -p_293 ∨ break
c  in DIMACS:
 2039 -2040  2041 -293 1162 0


c  2-1 --> 1
c    (-b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧ -p_293) -> (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0)
c  in CNF:
c     b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_2
c     b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_1
c     b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨  b^{1, 294}_0
c  in DIMACS:
 2039 -2040  2041  293 -2042 0
 2039 -2040  2041  293 -2043 0
 2039 -2040  2041  293  2044 0

c  1-1 --> 0
c    (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0 ∧ -p_293) -> (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧ -b^{1, 294}_0)
c  in CNF:
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_2
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_1
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_0
c  in DIMACS:
 2039  2040 -2041  293 -2042 0
 2039  2040 -2041  293 -2043 0
 2039  2040 -2041  293 -2044 0

c  0-1 --> -1
c    (-b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧ -p_293) -> ( b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0)
c  in CNF:
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨  b^{1, 294}_2
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_1
c     b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨  b^{1, 294}_0
c  in DIMACS:
 2039  2040  2041  293  2042 0
 2039  2040  2041  293 -2043 0
 2039  2040  2041  293  2044 0

c  -1-1 --> -2
c    ( b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧  b^{1, 293}_0 ∧ -p_293) -> ( b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0)
c  in CNF:
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨  b^{1, 294}_2
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨  b^{1, 294}_1
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨  p_293 ∨ -b^{1, 294}_0
c  in DIMACS:
-2039  2040 -2041  293  2042 0
-2039  2040 -2041  293  2043 0
-2039  2040 -2041  293 -2044 0

c  -2-1 --> break 
c    ( b^{1, 293}_2 ∧  b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧ -p_293) -> break
c  in CNF:
c    -b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨  b^{1, 293}_0 ∨  p_293 ∨ break
c  in DIMACS:
-2039 -2040  2041  293 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 293}_2 ∧ -b^{1, 293}_1 ∧ -b^{1, 293}_0 ∧ true) 
c  in CNF:
c    -b^{1, 293}_2 ∨  b^{1, 293}_1 ∨  b^{1, 293}_0 ∨ false 
c  in DIMACS:
-2039  2040  2041  0

c  3 does not represent an automaton state.
c    -(-b^{1, 293}_2 ∧  b^{1, 293}_1 ∧  b^{1, 293}_0 ∧ true) 
c  in CNF:
c     b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ false 
c  in DIMACS:
 2039 -2040 -2041  0
c  -3 does not represent an automaton state.
c    -( b^{1, 293}_2 ∧  b^{1, 293}_1 ∧  b^{1, 293}_0 ∧ true) 
c  in CNF:
c    -b^{1, 293}_2 ∨ -b^{1, 293}_1 ∨ -b^{1, 293}_0 ∨ false 
c  in DIMACS:
-2039 -2040 -2041  0

c i = 294
c  -2+1 --> -1
c    ( b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧  p_294) -> ( b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0)
c  in CNF:
c    -b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨  b^{1, 295}_2
c    -b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_1
c    -b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨  b^{1, 295}_0
c  in DIMACS:
-2042 -2043  2044 -294  2045 0
-2042 -2043  2044 -294 -2046 0
-2042 -2043  2044 -294  2047 0

c  -1+1 --> 0
c    ( b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0 ∧  p_294) -> (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧ -b^{1, 295}_0)
c  in CNF:
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_2
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_1
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_0
c  in DIMACS:
-2042  2043 -2044 -294 -2045 0
-2042  2043 -2044 -294 -2046 0
-2042  2043 -2044 -294 -2047 0

c  0+1 --> 1
c    (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧  p_294) -> (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0)
c  in CNF:
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_2
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_1
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨  b^{1, 295}_0
c  in DIMACS:
 2042  2043  2044 -294 -2045 0
 2042  2043  2044 -294 -2046 0
 2042  2043  2044 -294  2047 0

c  1+1 --> 2
c    (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0 ∧  p_294) -> (-b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0)
c  in CNF:
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_2
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨  b^{1, 295}_1
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ -p_294 ∨ -b^{1, 295}_0
c  in DIMACS:
 2042  2043 -2044 -294 -2045 0
 2042  2043 -2044 -294  2046 0
 2042  2043 -2044 -294 -2047 0

c  2+1 --> break 
c    (-b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧  p_294) -> break
c  in CNF:
c     b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 2042 -2043  2044 -294 1162 0


c  2-1 --> 1
c    (-b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧ -p_294) -> (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0)
c  in CNF:
c     b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_2
c     b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_1
c     b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨  b^{1, 295}_0
c  in DIMACS:
 2042 -2043  2044  294 -2045 0
 2042 -2043  2044  294 -2046 0
 2042 -2043  2044  294  2047 0

c  1-1 --> 0
c    (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0 ∧ -p_294) -> (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧ -b^{1, 295}_0)
c  in CNF:
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_2
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_1
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_0
c  in DIMACS:
 2042  2043 -2044  294 -2045 0
 2042  2043 -2044  294 -2046 0
 2042  2043 -2044  294 -2047 0

c  0-1 --> -1
c    (-b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧ -p_294) -> ( b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0)
c  in CNF:
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨  b^{1, 295}_2
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_1
c     b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨  b^{1, 295}_0
c  in DIMACS:
 2042  2043  2044  294  2045 0
 2042  2043  2044  294 -2046 0
 2042  2043  2044  294  2047 0

c  -1-1 --> -2
c    ( b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧  b^{1, 294}_0 ∧ -p_294) -> ( b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0)
c  in CNF:
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨  b^{1, 295}_2
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨  b^{1, 295}_1
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨  p_294 ∨ -b^{1, 295}_0
c  in DIMACS:
-2042  2043 -2044  294  2045 0
-2042  2043 -2044  294  2046 0
-2042  2043 -2044  294 -2047 0

c  -2-1 --> break 
c    ( b^{1, 294}_2 ∧  b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨  b^{1, 294}_0 ∨  p_294 ∨ break
c  in DIMACS:
-2042 -2043  2044  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 294}_2 ∧ -b^{1, 294}_1 ∧ -b^{1, 294}_0 ∧ true) 
c  in CNF:
c    -b^{1, 294}_2 ∨  b^{1, 294}_1 ∨  b^{1, 294}_0 ∨ false 
c  in DIMACS:
-2042  2043  2044  0

c  3 does not represent an automaton state.
c    -(-b^{1, 294}_2 ∧  b^{1, 294}_1 ∧  b^{1, 294}_0 ∧ true) 
c  in CNF:
c     b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ false 
c  in DIMACS:
 2042 -2043 -2044  0
c  -3 does not represent an automaton state.
c    -( b^{1, 294}_2 ∧  b^{1, 294}_1 ∧  b^{1, 294}_0 ∧ true) 
c  in CNF:
c    -b^{1, 294}_2 ∨ -b^{1, 294}_1 ∨ -b^{1, 294}_0 ∨ false 
c  in DIMACS:
-2042 -2043 -2044  0

c i = 295
c  -2+1 --> -1
c    ( b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧  p_295) -> ( b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0)
c  in CNF:
c    -b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨  b^{1, 296}_2
c    -b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_1
c    -b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨  b^{1, 296}_0
c  in DIMACS:
-2045 -2046  2047 -295  2048 0
-2045 -2046  2047 -295 -2049 0
-2045 -2046  2047 -295  2050 0

c  -1+1 --> 0
c    ( b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0 ∧  p_295) -> (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧ -b^{1, 296}_0)
c  in CNF:
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_2
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_1
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_0
c  in DIMACS:
-2045  2046 -2047 -295 -2048 0
-2045  2046 -2047 -295 -2049 0
-2045  2046 -2047 -295 -2050 0

c  0+1 --> 1
c    (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧  p_295) -> (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0)
c  in CNF:
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_2
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_1
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨  b^{1, 296}_0
c  in DIMACS:
 2045  2046  2047 -295 -2048 0
 2045  2046  2047 -295 -2049 0
 2045  2046  2047 -295  2050 0

c  1+1 --> 2
c    (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0 ∧  p_295) -> (-b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0)
c  in CNF:
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_2
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨  b^{1, 296}_1
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ -p_295 ∨ -b^{1, 296}_0
c  in DIMACS:
 2045  2046 -2047 -295 -2048 0
 2045  2046 -2047 -295  2049 0
 2045  2046 -2047 -295 -2050 0

c  2+1 --> break 
c    (-b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧  p_295) -> break
c  in CNF:
c     b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ -p_295 ∨ break
c  in DIMACS:
 2045 -2046  2047 -295 1162 0


c  2-1 --> 1
c    (-b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧ -p_295) -> (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0)
c  in CNF:
c     b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_2
c     b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_1
c     b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨  b^{1, 296}_0
c  in DIMACS:
 2045 -2046  2047  295 -2048 0
 2045 -2046  2047  295 -2049 0
 2045 -2046  2047  295  2050 0

c  1-1 --> 0
c    (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0 ∧ -p_295) -> (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧ -b^{1, 296}_0)
c  in CNF:
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_2
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_1
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_0
c  in DIMACS:
 2045  2046 -2047  295 -2048 0
 2045  2046 -2047  295 -2049 0
 2045  2046 -2047  295 -2050 0

c  0-1 --> -1
c    (-b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧ -p_295) -> ( b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0)
c  in CNF:
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨  b^{1, 296}_2
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_1
c     b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨  b^{1, 296}_0
c  in DIMACS:
 2045  2046  2047  295  2048 0
 2045  2046  2047  295 -2049 0
 2045  2046  2047  295  2050 0

c  -1-1 --> -2
c    ( b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧  b^{1, 295}_0 ∧ -p_295) -> ( b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0)
c  in CNF:
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨  b^{1, 296}_2
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨  b^{1, 296}_1
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨  p_295 ∨ -b^{1, 296}_0
c  in DIMACS:
-2045  2046 -2047  295  2048 0
-2045  2046 -2047  295  2049 0
-2045  2046 -2047  295 -2050 0

c  -2-1 --> break 
c    ( b^{1, 295}_2 ∧  b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧ -p_295) -> break
c  in CNF:
c    -b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨  b^{1, 295}_0 ∨  p_295 ∨ break
c  in DIMACS:
-2045 -2046  2047  295 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 295}_2 ∧ -b^{1, 295}_1 ∧ -b^{1, 295}_0 ∧ true) 
c  in CNF:
c    -b^{1, 295}_2 ∨  b^{1, 295}_1 ∨  b^{1, 295}_0 ∨ false 
c  in DIMACS:
-2045  2046  2047  0

c  3 does not represent an automaton state.
c    -(-b^{1, 295}_2 ∧  b^{1, 295}_1 ∧  b^{1, 295}_0 ∧ true) 
c  in CNF:
c     b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ false 
c  in DIMACS:
 2045 -2046 -2047  0
c  -3 does not represent an automaton state.
c    -( b^{1, 295}_2 ∧  b^{1, 295}_1 ∧  b^{1, 295}_0 ∧ true) 
c  in CNF:
c    -b^{1, 295}_2 ∨ -b^{1, 295}_1 ∨ -b^{1, 295}_0 ∨ false 
c  in DIMACS:
-2045 -2046 -2047  0

c i = 296
c  -2+1 --> -1
c    ( b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧  p_296) -> ( b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0)
c  in CNF:
c    -b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨  b^{1, 297}_2
c    -b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_1
c    -b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨  b^{1, 297}_0
c  in DIMACS:
-2048 -2049  2050 -296  2051 0
-2048 -2049  2050 -296 -2052 0
-2048 -2049  2050 -296  2053 0

c  -1+1 --> 0
c    ( b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0 ∧  p_296) -> (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧ -b^{1, 297}_0)
c  in CNF:
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_2
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_1
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_0
c  in DIMACS:
-2048  2049 -2050 -296 -2051 0
-2048  2049 -2050 -296 -2052 0
-2048  2049 -2050 -296 -2053 0

c  0+1 --> 1
c    (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧  p_296) -> (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0)
c  in CNF:
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_2
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_1
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨  b^{1, 297}_0
c  in DIMACS:
 2048  2049  2050 -296 -2051 0
 2048  2049  2050 -296 -2052 0
 2048  2049  2050 -296  2053 0

c  1+1 --> 2
c    (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0 ∧  p_296) -> (-b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0)
c  in CNF:
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_2
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨  b^{1, 297}_1
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ -p_296 ∨ -b^{1, 297}_0
c  in DIMACS:
 2048  2049 -2050 -296 -2051 0
 2048  2049 -2050 -296  2052 0
 2048  2049 -2050 -296 -2053 0

c  2+1 --> break 
c    (-b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧  p_296) -> break
c  in CNF:
c     b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 2048 -2049  2050 -296 1162 0


c  2-1 --> 1
c    (-b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧ -p_296) -> (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0)
c  in CNF:
c     b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_2
c     b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_1
c     b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨  b^{1, 297}_0
c  in DIMACS:
 2048 -2049  2050  296 -2051 0
 2048 -2049  2050  296 -2052 0
 2048 -2049  2050  296  2053 0

c  1-1 --> 0
c    (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0 ∧ -p_296) -> (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧ -b^{1, 297}_0)
c  in CNF:
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_2
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_1
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_0
c  in DIMACS:
 2048  2049 -2050  296 -2051 0
 2048  2049 -2050  296 -2052 0
 2048  2049 -2050  296 -2053 0

c  0-1 --> -1
c    (-b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧ -p_296) -> ( b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0)
c  in CNF:
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨  b^{1, 297}_2
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_1
c     b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨  b^{1, 297}_0
c  in DIMACS:
 2048  2049  2050  296  2051 0
 2048  2049  2050  296 -2052 0
 2048  2049  2050  296  2053 0

c  -1-1 --> -2
c    ( b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧  b^{1, 296}_0 ∧ -p_296) -> ( b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0)
c  in CNF:
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨  b^{1, 297}_2
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨  b^{1, 297}_1
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨  p_296 ∨ -b^{1, 297}_0
c  in DIMACS:
-2048  2049 -2050  296  2051 0
-2048  2049 -2050  296  2052 0
-2048  2049 -2050  296 -2053 0

c  -2-1 --> break 
c    ( b^{1, 296}_2 ∧  b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨  b^{1, 296}_0 ∨  p_296 ∨ break
c  in DIMACS:
-2048 -2049  2050  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 296}_2 ∧ -b^{1, 296}_1 ∧ -b^{1, 296}_0 ∧ true) 
c  in CNF:
c    -b^{1, 296}_2 ∨  b^{1, 296}_1 ∨  b^{1, 296}_0 ∨ false 
c  in DIMACS:
-2048  2049  2050  0

c  3 does not represent an automaton state.
c    -(-b^{1, 296}_2 ∧  b^{1, 296}_1 ∧  b^{1, 296}_0 ∧ true) 
c  in CNF:
c     b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ false 
c  in DIMACS:
 2048 -2049 -2050  0
c  -3 does not represent an automaton state.
c    -( b^{1, 296}_2 ∧  b^{1, 296}_1 ∧  b^{1, 296}_0 ∧ true) 
c  in CNF:
c    -b^{1, 296}_2 ∨ -b^{1, 296}_1 ∨ -b^{1, 296}_0 ∨ false 
c  in DIMACS:
-2048 -2049 -2050  0

c i = 297
c  -2+1 --> -1
c    ( b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧  p_297) -> ( b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0)
c  in CNF:
c    -b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨  b^{1, 298}_2
c    -b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_1
c    -b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨  b^{1, 298}_0
c  in DIMACS:
-2051 -2052  2053 -297  2054 0
-2051 -2052  2053 -297 -2055 0
-2051 -2052  2053 -297  2056 0

c  -1+1 --> 0
c    ( b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0 ∧  p_297) -> (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧ -b^{1, 298}_0)
c  in CNF:
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_2
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_1
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_0
c  in DIMACS:
-2051  2052 -2053 -297 -2054 0
-2051  2052 -2053 -297 -2055 0
-2051  2052 -2053 -297 -2056 0

c  0+1 --> 1
c    (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧  p_297) -> (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0)
c  in CNF:
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_2
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_1
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨  b^{1, 298}_0
c  in DIMACS:
 2051  2052  2053 -297 -2054 0
 2051  2052  2053 -297 -2055 0
 2051  2052  2053 -297  2056 0

c  1+1 --> 2
c    (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0 ∧  p_297) -> (-b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0)
c  in CNF:
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_2
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨  b^{1, 298}_1
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ -p_297 ∨ -b^{1, 298}_0
c  in DIMACS:
 2051  2052 -2053 -297 -2054 0
 2051  2052 -2053 -297  2055 0
 2051  2052 -2053 -297 -2056 0

c  2+1 --> break 
c    (-b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧  p_297) -> break
c  in CNF:
c     b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 2051 -2052  2053 -297 1162 0


c  2-1 --> 1
c    (-b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧ -p_297) -> (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0)
c  in CNF:
c     b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_2
c     b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_1
c     b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨  b^{1, 298}_0
c  in DIMACS:
 2051 -2052  2053  297 -2054 0
 2051 -2052  2053  297 -2055 0
 2051 -2052  2053  297  2056 0

c  1-1 --> 0
c    (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0 ∧ -p_297) -> (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧ -b^{1, 298}_0)
c  in CNF:
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_2
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_1
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_0
c  in DIMACS:
 2051  2052 -2053  297 -2054 0
 2051  2052 -2053  297 -2055 0
 2051  2052 -2053  297 -2056 0

c  0-1 --> -1
c    (-b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧ -p_297) -> ( b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0)
c  in CNF:
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨  b^{1, 298}_2
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_1
c     b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨  b^{1, 298}_0
c  in DIMACS:
 2051  2052  2053  297  2054 0
 2051  2052  2053  297 -2055 0
 2051  2052  2053  297  2056 0

c  -1-1 --> -2
c    ( b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧  b^{1, 297}_0 ∧ -p_297) -> ( b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0)
c  in CNF:
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨  b^{1, 298}_2
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨  b^{1, 298}_1
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨  p_297 ∨ -b^{1, 298}_0
c  in DIMACS:
-2051  2052 -2053  297  2054 0
-2051  2052 -2053  297  2055 0
-2051  2052 -2053  297 -2056 0

c  -2-1 --> break 
c    ( b^{1, 297}_2 ∧  b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨  b^{1, 297}_0 ∨  p_297 ∨ break
c  in DIMACS:
-2051 -2052  2053  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 297}_2 ∧ -b^{1, 297}_1 ∧ -b^{1, 297}_0 ∧ true) 
c  in CNF:
c    -b^{1, 297}_2 ∨  b^{1, 297}_1 ∨  b^{1, 297}_0 ∨ false 
c  in DIMACS:
-2051  2052  2053  0

c  3 does not represent an automaton state.
c    -(-b^{1, 297}_2 ∧  b^{1, 297}_1 ∧  b^{1, 297}_0 ∧ true) 
c  in CNF:
c     b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ false 
c  in DIMACS:
 2051 -2052 -2053  0
c  -3 does not represent an automaton state.
c    -( b^{1, 297}_2 ∧  b^{1, 297}_1 ∧  b^{1, 297}_0 ∧ true) 
c  in CNF:
c    -b^{1, 297}_2 ∨ -b^{1, 297}_1 ∨ -b^{1, 297}_0 ∨ false 
c  in DIMACS:
-2051 -2052 -2053  0

c i = 298
c  -2+1 --> -1
c    ( b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧  p_298) -> ( b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0)
c  in CNF:
c    -b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨  b^{1, 299}_2
c    -b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_1
c    -b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨  b^{1, 299}_0
c  in DIMACS:
-2054 -2055  2056 -298  2057 0
-2054 -2055  2056 -298 -2058 0
-2054 -2055  2056 -298  2059 0

c  -1+1 --> 0
c    ( b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0 ∧  p_298) -> (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧ -b^{1, 299}_0)
c  in CNF:
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_2
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_1
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_0
c  in DIMACS:
-2054  2055 -2056 -298 -2057 0
-2054  2055 -2056 -298 -2058 0
-2054  2055 -2056 -298 -2059 0

c  0+1 --> 1
c    (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧  p_298) -> (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0)
c  in CNF:
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_2
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_1
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨  b^{1, 299}_0
c  in DIMACS:
 2054  2055  2056 -298 -2057 0
 2054  2055  2056 -298 -2058 0
 2054  2055  2056 -298  2059 0

c  1+1 --> 2
c    (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0 ∧  p_298) -> (-b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0)
c  in CNF:
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_2
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨  b^{1, 299}_1
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ -p_298 ∨ -b^{1, 299}_0
c  in DIMACS:
 2054  2055 -2056 -298 -2057 0
 2054  2055 -2056 -298  2058 0
 2054  2055 -2056 -298 -2059 0

c  2+1 --> break 
c    (-b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧  p_298) -> break
c  in CNF:
c     b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ -p_298 ∨ break
c  in DIMACS:
 2054 -2055  2056 -298 1162 0


c  2-1 --> 1
c    (-b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧ -p_298) -> (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0)
c  in CNF:
c     b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_2
c     b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_1
c     b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨  b^{1, 299}_0
c  in DIMACS:
 2054 -2055  2056  298 -2057 0
 2054 -2055  2056  298 -2058 0
 2054 -2055  2056  298  2059 0

c  1-1 --> 0
c    (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0 ∧ -p_298) -> (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧ -b^{1, 299}_0)
c  in CNF:
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_2
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_1
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_0
c  in DIMACS:
 2054  2055 -2056  298 -2057 0
 2054  2055 -2056  298 -2058 0
 2054  2055 -2056  298 -2059 0

c  0-1 --> -1
c    (-b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧ -p_298) -> ( b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0)
c  in CNF:
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨  b^{1, 299}_2
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_1
c     b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨  b^{1, 299}_0
c  in DIMACS:
 2054  2055  2056  298  2057 0
 2054  2055  2056  298 -2058 0
 2054  2055  2056  298  2059 0

c  -1-1 --> -2
c    ( b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧  b^{1, 298}_0 ∧ -p_298) -> ( b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0)
c  in CNF:
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨  b^{1, 299}_2
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨  b^{1, 299}_1
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨  p_298 ∨ -b^{1, 299}_0
c  in DIMACS:
-2054  2055 -2056  298  2057 0
-2054  2055 -2056  298  2058 0
-2054  2055 -2056  298 -2059 0

c  -2-1 --> break 
c    ( b^{1, 298}_2 ∧  b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧ -p_298) -> break
c  in CNF:
c    -b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨  b^{1, 298}_0 ∨  p_298 ∨ break
c  in DIMACS:
-2054 -2055  2056  298 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 298}_2 ∧ -b^{1, 298}_1 ∧ -b^{1, 298}_0 ∧ true) 
c  in CNF:
c    -b^{1, 298}_2 ∨  b^{1, 298}_1 ∨  b^{1, 298}_0 ∨ false 
c  in DIMACS:
-2054  2055  2056  0

c  3 does not represent an automaton state.
c    -(-b^{1, 298}_2 ∧  b^{1, 298}_1 ∧  b^{1, 298}_0 ∧ true) 
c  in CNF:
c     b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ false 
c  in DIMACS:
 2054 -2055 -2056  0
c  -3 does not represent an automaton state.
c    -( b^{1, 298}_2 ∧  b^{1, 298}_1 ∧  b^{1, 298}_0 ∧ true) 
c  in CNF:
c    -b^{1, 298}_2 ∨ -b^{1, 298}_1 ∨ -b^{1, 298}_0 ∨ false 
c  in DIMACS:
-2054 -2055 -2056  0

c i = 299
c  -2+1 --> -1
c    ( b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧  p_299) -> ( b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0)
c  in CNF:
c    -b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨  b^{1, 300}_2
c    -b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_1
c    -b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨  b^{1, 300}_0
c  in DIMACS:
-2057 -2058  2059 -299  2060 0
-2057 -2058  2059 -299 -2061 0
-2057 -2058  2059 -299  2062 0

c  -1+1 --> 0
c    ( b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0 ∧  p_299) -> (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧ -b^{1, 300}_0)
c  in CNF:
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_2
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_1
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_0
c  in DIMACS:
-2057  2058 -2059 -299 -2060 0
-2057  2058 -2059 -299 -2061 0
-2057  2058 -2059 -299 -2062 0

c  0+1 --> 1
c    (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧  p_299) -> (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0)
c  in CNF:
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_2
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_1
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨  b^{1, 300}_0
c  in DIMACS:
 2057  2058  2059 -299 -2060 0
 2057  2058  2059 -299 -2061 0
 2057  2058  2059 -299  2062 0

c  1+1 --> 2
c    (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0 ∧  p_299) -> (-b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0)
c  in CNF:
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_2
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨  b^{1, 300}_1
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ -p_299 ∨ -b^{1, 300}_0
c  in DIMACS:
 2057  2058 -2059 -299 -2060 0
 2057  2058 -2059 -299  2061 0
 2057  2058 -2059 -299 -2062 0

c  2+1 --> break 
c    (-b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧  p_299) -> break
c  in CNF:
c     b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ -p_299 ∨ break
c  in DIMACS:
 2057 -2058  2059 -299 1162 0


c  2-1 --> 1
c    (-b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧ -p_299) -> (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0)
c  in CNF:
c     b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_2
c     b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_1
c     b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨  b^{1, 300}_0
c  in DIMACS:
 2057 -2058  2059  299 -2060 0
 2057 -2058  2059  299 -2061 0
 2057 -2058  2059  299  2062 0

c  1-1 --> 0
c    (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0 ∧ -p_299) -> (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧ -b^{1, 300}_0)
c  in CNF:
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_2
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_1
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_0
c  in DIMACS:
 2057  2058 -2059  299 -2060 0
 2057  2058 -2059  299 -2061 0
 2057  2058 -2059  299 -2062 0

c  0-1 --> -1
c    (-b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧ -p_299) -> ( b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0)
c  in CNF:
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨  b^{1, 300}_2
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_1
c     b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨  b^{1, 300}_0
c  in DIMACS:
 2057  2058  2059  299  2060 0
 2057  2058  2059  299 -2061 0
 2057  2058  2059  299  2062 0

c  -1-1 --> -2
c    ( b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧  b^{1, 299}_0 ∧ -p_299) -> ( b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0)
c  in CNF:
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨  b^{1, 300}_2
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨  b^{1, 300}_1
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨  p_299 ∨ -b^{1, 300}_0
c  in DIMACS:
-2057  2058 -2059  299  2060 0
-2057  2058 -2059  299  2061 0
-2057  2058 -2059  299 -2062 0

c  -2-1 --> break 
c    ( b^{1, 299}_2 ∧  b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧ -p_299) -> break
c  in CNF:
c    -b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨  b^{1, 299}_0 ∨  p_299 ∨ break
c  in DIMACS:
-2057 -2058  2059  299 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 299}_2 ∧ -b^{1, 299}_1 ∧ -b^{1, 299}_0 ∧ true) 
c  in CNF:
c    -b^{1, 299}_2 ∨  b^{1, 299}_1 ∨  b^{1, 299}_0 ∨ false 
c  in DIMACS:
-2057  2058  2059  0

c  3 does not represent an automaton state.
c    -(-b^{1, 299}_2 ∧  b^{1, 299}_1 ∧  b^{1, 299}_0 ∧ true) 
c  in CNF:
c     b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ false 
c  in DIMACS:
 2057 -2058 -2059  0
c  -3 does not represent an automaton state.
c    -( b^{1, 299}_2 ∧  b^{1, 299}_1 ∧  b^{1, 299}_0 ∧ true) 
c  in CNF:
c    -b^{1, 299}_2 ∨ -b^{1, 299}_1 ∨ -b^{1, 299}_0 ∨ false 
c  in DIMACS:
-2057 -2058 -2059  0

c i = 300
c  -2+1 --> -1
c    ( b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧  p_300) -> ( b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0)
c  in CNF:
c    -b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨  b^{1, 301}_2
c    -b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_1
c    -b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨  b^{1, 301}_0
c  in DIMACS:
-2060 -2061  2062 -300  2063 0
-2060 -2061  2062 -300 -2064 0
-2060 -2061  2062 -300  2065 0

c  -1+1 --> 0
c    ( b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0 ∧  p_300) -> (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧ -b^{1, 301}_0)
c  in CNF:
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_2
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_1
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_0
c  in DIMACS:
-2060  2061 -2062 -300 -2063 0
-2060  2061 -2062 -300 -2064 0
-2060  2061 -2062 -300 -2065 0

c  0+1 --> 1
c    (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧  p_300) -> (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0)
c  in CNF:
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_2
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_1
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨  b^{1, 301}_0
c  in DIMACS:
 2060  2061  2062 -300 -2063 0
 2060  2061  2062 -300 -2064 0
 2060  2061  2062 -300  2065 0

c  1+1 --> 2
c    (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0 ∧  p_300) -> (-b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0)
c  in CNF:
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_2
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨  b^{1, 301}_1
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ -p_300 ∨ -b^{1, 301}_0
c  in DIMACS:
 2060  2061 -2062 -300 -2063 0
 2060  2061 -2062 -300  2064 0
 2060  2061 -2062 -300 -2065 0

c  2+1 --> break 
c    (-b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧  p_300) -> break
c  in CNF:
c     b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 2060 -2061  2062 -300 1162 0


c  2-1 --> 1
c    (-b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧ -p_300) -> (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0)
c  in CNF:
c     b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_2
c     b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_1
c     b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨  b^{1, 301}_0
c  in DIMACS:
 2060 -2061  2062  300 -2063 0
 2060 -2061  2062  300 -2064 0
 2060 -2061  2062  300  2065 0

c  1-1 --> 0
c    (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0 ∧ -p_300) -> (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧ -b^{1, 301}_0)
c  in CNF:
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_2
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_1
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_0
c  in DIMACS:
 2060  2061 -2062  300 -2063 0
 2060  2061 -2062  300 -2064 0
 2060  2061 -2062  300 -2065 0

c  0-1 --> -1
c    (-b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧ -p_300) -> ( b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0)
c  in CNF:
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨  b^{1, 301}_2
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_1
c     b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨  b^{1, 301}_0
c  in DIMACS:
 2060  2061  2062  300  2063 0
 2060  2061  2062  300 -2064 0
 2060  2061  2062  300  2065 0

c  -1-1 --> -2
c    ( b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧  b^{1, 300}_0 ∧ -p_300) -> ( b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0)
c  in CNF:
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨  b^{1, 301}_2
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨  b^{1, 301}_1
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨  p_300 ∨ -b^{1, 301}_0
c  in DIMACS:
-2060  2061 -2062  300  2063 0
-2060  2061 -2062  300  2064 0
-2060  2061 -2062  300 -2065 0

c  -2-1 --> break 
c    ( b^{1, 300}_2 ∧  b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨  b^{1, 300}_0 ∨  p_300 ∨ break
c  in DIMACS:
-2060 -2061  2062  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 300}_2 ∧ -b^{1, 300}_1 ∧ -b^{1, 300}_0 ∧ true) 
c  in CNF:
c    -b^{1, 300}_2 ∨  b^{1, 300}_1 ∨  b^{1, 300}_0 ∨ false 
c  in DIMACS:
-2060  2061  2062  0

c  3 does not represent an automaton state.
c    -(-b^{1, 300}_2 ∧  b^{1, 300}_1 ∧  b^{1, 300}_0 ∧ true) 
c  in CNF:
c     b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ false 
c  in DIMACS:
 2060 -2061 -2062  0
c  -3 does not represent an automaton state.
c    -( b^{1, 300}_2 ∧  b^{1, 300}_1 ∧  b^{1, 300}_0 ∧ true) 
c  in CNF:
c    -b^{1, 300}_2 ∨ -b^{1, 300}_1 ∨ -b^{1, 300}_0 ∨ false 
c  in DIMACS:
-2060 -2061 -2062  0

c i = 301
c  -2+1 --> -1
c    ( b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧  p_301) -> ( b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0)
c  in CNF:
c    -b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨  b^{1, 302}_2
c    -b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_1
c    -b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨  b^{1, 302}_0
c  in DIMACS:
-2063 -2064  2065 -301  2066 0
-2063 -2064  2065 -301 -2067 0
-2063 -2064  2065 -301  2068 0

c  -1+1 --> 0
c    ( b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0 ∧  p_301) -> (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧ -b^{1, 302}_0)
c  in CNF:
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_2
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_1
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_0
c  in DIMACS:
-2063  2064 -2065 -301 -2066 0
-2063  2064 -2065 -301 -2067 0
-2063  2064 -2065 -301 -2068 0

c  0+1 --> 1
c    (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧  p_301) -> (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0)
c  in CNF:
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_2
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_1
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨  b^{1, 302}_0
c  in DIMACS:
 2063  2064  2065 -301 -2066 0
 2063  2064  2065 -301 -2067 0
 2063  2064  2065 -301  2068 0

c  1+1 --> 2
c    (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0 ∧  p_301) -> (-b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0)
c  in CNF:
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_2
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨  b^{1, 302}_1
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ -p_301 ∨ -b^{1, 302}_0
c  in DIMACS:
 2063  2064 -2065 -301 -2066 0
 2063  2064 -2065 -301  2067 0
 2063  2064 -2065 -301 -2068 0

c  2+1 --> break 
c    (-b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧  p_301) -> break
c  in CNF:
c     b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ -p_301 ∨ break
c  in DIMACS:
 2063 -2064  2065 -301 1162 0


c  2-1 --> 1
c    (-b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧ -p_301) -> (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0)
c  in CNF:
c     b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_2
c     b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_1
c     b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨  b^{1, 302}_0
c  in DIMACS:
 2063 -2064  2065  301 -2066 0
 2063 -2064  2065  301 -2067 0
 2063 -2064  2065  301  2068 0

c  1-1 --> 0
c    (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0 ∧ -p_301) -> (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧ -b^{1, 302}_0)
c  in CNF:
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_2
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_1
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_0
c  in DIMACS:
 2063  2064 -2065  301 -2066 0
 2063  2064 -2065  301 -2067 0
 2063  2064 -2065  301 -2068 0

c  0-1 --> -1
c    (-b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧ -p_301) -> ( b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0)
c  in CNF:
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨  b^{1, 302}_2
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_1
c     b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨  b^{1, 302}_0
c  in DIMACS:
 2063  2064  2065  301  2066 0
 2063  2064  2065  301 -2067 0
 2063  2064  2065  301  2068 0

c  -1-1 --> -2
c    ( b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧  b^{1, 301}_0 ∧ -p_301) -> ( b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0)
c  in CNF:
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨  b^{1, 302}_2
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨  b^{1, 302}_1
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨  p_301 ∨ -b^{1, 302}_0
c  in DIMACS:
-2063  2064 -2065  301  2066 0
-2063  2064 -2065  301  2067 0
-2063  2064 -2065  301 -2068 0

c  -2-1 --> break 
c    ( b^{1, 301}_2 ∧  b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧ -p_301) -> break
c  in CNF:
c    -b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨  b^{1, 301}_0 ∨  p_301 ∨ break
c  in DIMACS:
-2063 -2064  2065  301 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 301}_2 ∧ -b^{1, 301}_1 ∧ -b^{1, 301}_0 ∧ true) 
c  in CNF:
c    -b^{1, 301}_2 ∨  b^{1, 301}_1 ∨  b^{1, 301}_0 ∨ false 
c  in DIMACS:
-2063  2064  2065  0

c  3 does not represent an automaton state.
c    -(-b^{1, 301}_2 ∧  b^{1, 301}_1 ∧  b^{1, 301}_0 ∧ true) 
c  in CNF:
c     b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ false 
c  in DIMACS:
 2063 -2064 -2065  0
c  -3 does not represent an automaton state.
c    -( b^{1, 301}_2 ∧  b^{1, 301}_1 ∧  b^{1, 301}_0 ∧ true) 
c  in CNF:
c    -b^{1, 301}_2 ∨ -b^{1, 301}_1 ∨ -b^{1, 301}_0 ∨ false 
c  in DIMACS:
-2063 -2064 -2065  0

c i = 302
c  -2+1 --> -1
c    ( b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧  p_302) -> ( b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0)
c  in CNF:
c    -b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨  b^{1, 303}_2
c    -b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_1
c    -b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨  b^{1, 303}_0
c  in DIMACS:
-2066 -2067  2068 -302  2069 0
-2066 -2067  2068 -302 -2070 0
-2066 -2067  2068 -302  2071 0

c  -1+1 --> 0
c    ( b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0 ∧  p_302) -> (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧ -b^{1, 303}_0)
c  in CNF:
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_2
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_1
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_0
c  in DIMACS:
-2066  2067 -2068 -302 -2069 0
-2066  2067 -2068 -302 -2070 0
-2066  2067 -2068 -302 -2071 0

c  0+1 --> 1
c    (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧  p_302) -> (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0)
c  in CNF:
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_2
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_1
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨  b^{1, 303}_0
c  in DIMACS:
 2066  2067  2068 -302 -2069 0
 2066  2067  2068 -302 -2070 0
 2066  2067  2068 -302  2071 0

c  1+1 --> 2
c    (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0 ∧  p_302) -> (-b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0)
c  in CNF:
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_2
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨  b^{1, 303}_1
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ -p_302 ∨ -b^{1, 303}_0
c  in DIMACS:
 2066  2067 -2068 -302 -2069 0
 2066  2067 -2068 -302  2070 0
 2066  2067 -2068 -302 -2071 0

c  2+1 --> break 
c    (-b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧  p_302) -> break
c  in CNF:
c     b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ -p_302 ∨ break
c  in DIMACS:
 2066 -2067  2068 -302 1162 0


c  2-1 --> 1
c    (-b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧ -p_302) -> (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0)
c  in CNF:
c     b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_2
c     b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_1
c     b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨  b^{1, 303}_0
c  in DIMACS:
 2066 -2067  2068  302 -2069 0
 2066 -2067  2068  302 -2070 0
 2066 -2067  2068  302  2071 0

c  1-1 --> 0
c    (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0 ∧ -p_302) -> (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧ -b^{1, 303}_0)
c  in CNF:
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_2
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_1
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_0
c  in DIMACS:
 2066  2067 -2068  302 -2069 0
 2066  2067 -2068  302 -2070 0
 2066  2067 -2068  302 -2071 0

c  0-1 --> -1
c    (-b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧ -p_302) -> ( b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0)
c  in CNF:
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨  b^{1, 303}_2
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_1
c     b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨  b^{1, 303}_0
c  in DIMACS:
 2066  2067  2068  302  2069 0
 2066  2067  2068  302 -2070 0
 2066  2067  2068  302  2071 0

c  -1-1 --> -2
c    ( b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧  b^{1, 302}_0 ∧ -p_302) -> ( b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0)
c  in CNF:
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨  b^{1, 303}_2
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨  b^{1, 303}_1
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨  p_302 ∨ -b^{1, 303}_0
c  in DIMACS:
-2066  2067 -2068  302  2069 0
-2066  2067 -2068  302  2070 0
-2066  2067 -2068  302 -2071 0

c  -2-1 --> break 
c    ( b^{1, 302}_2 ∧  b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧ -p_302) -> break
c  in CNF:
c    -b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨  b^{1, 302}_0 ∨  p_302 ∨ break
c  in DIMACS:
-2066 -2067  2068  302 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 302}_2 ∧ -b^{1, 302}_1 ∧ -b^{1, 302}_0 ∧ true) 
c  in CNF:
c    -b^{1, 302}_2 ∨  b^{1, 302}_1 ∨  b^{1, 302}_0 ∨ false 
c  in DIMACS:
-2066  2067  2068  0

c  3 does not represent an automaton state.
c    -(-b^{1, 302}_2 ∧  b^{1, 302}_1 ∧  b^{1, 302}_0 ∧ true) 
c  in CNF:
c     b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ false 
c  in DIMACS:
 2066 -2067 -2068  0
c  -3 does not represent an automaton state.
c    -( b^{1, 302}_2 ∧  b^{1, 302}_1 ∧  b^{1, 302}_0 ∧ true) 
c  in CNF:
c    -b^{1, 302}_2 ∨ -b^{1, 302}_1 ∨ -b^{1, 302}_0 ∨ false 
c  in DIMACS:
-2066 -2067 -2068  0

c i = 303
c  -2+1 --> -1
c    ( b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧  p_303) -> ( b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0)
c  in CNF:
c    -b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨  b^{1, 304}_2
c    -b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_1
c    -b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨  b^{1, 304}_0
c  in DIMACS:
-2069 -2070  2071 -303  2072 0
-2069 -2070  2071 -303 -2073 0
-2069 -2070  2071 -303  2074 0

c  -1+1 --> 0
c    ( b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0 ∧  p_303) -> (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧ -b^{1, 304}_0)
c  in CNF:
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_2
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_1
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_0
c  in DIMACS:
-2069  2070 -2071 -303 -2072 0
-2069  2070 -2071 -303 -2073 0
-2069  2070 -2071 -303 -2074 0

c  0+1 --> 1
c    (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧  p_303) -> (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0)
c  in CNF:
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_2
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_1
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨  b^{1, 304}_0
c  in DIMACS:
 2069  2070  2071 -303 -2072 0
 2069  2070  2071 -303 -2073 0
 2069  2070  2071 -303  2074 0

c  1+1 --> 2
c    (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0 ∧  p_303) -> (-b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0)
c  in CNF:
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_2
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨  b^{1, 304}_1
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ -p_303 ∨ -b^{1, 304}_0
c  in DIMACS:
 2069  2070 -2071 -303 -2072 0
 2069  2070 -2071 -303  2073 0
 2069  2070 -2071 -303 -2074 0

c  2+1 --> break 
c    (-b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧  p_303) -> break
c  in CNF:
c     b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ -p_303 ∨ break
c  in DIMACS:
 2069 -2070  2071 -303 1162 0


c  2-1 --> 1
c    (-b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧ -p_303) -> (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0)
c  in CNF:
c     b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_2
c     b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_1
c     b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨  b^{1, 304}_0
c  in DIMACS:
 2069 -2070  2071  303 -2072 0
 2069 -2070  2071  303 -2073 0
 2069 -2070  2071  303  2074 0

c  1-1 --> 0
c    (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0 ∧ -p_303) -> (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧ -b^{1, 304}_0)
c  in CNF:
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_2
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_1
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_0
c  in DIMACS:
 2069  2070 -2071  303 -2072 0
 2069  2070 -2071  303 -2073 0
 2069  2070 -2071  303 -2074 0

c  0-1 --> -1
c    (-b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧ -p_303) -> ( b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0)
c  in CNF:
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨  b^{1, 304}_2
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_1
c     b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨  b^{1, 304}_0
c  in DIMACS:
 2069  2070  2071  303  2072 0
 2069  2070  2071  303 -2073 0
 2069  2070  2071  303  2074 0

c  -1-1 --> -2
c    ( b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧  b^{1, 303}_0 ∧ -p_303) -> ( b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0)
c  in CNF:
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨  b^{1, 304}_2
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨  b^{1, 304}_1
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨  p_303 ∨ -b^{1, 304}_0
c  in DIMACS:
-2069  2070 -2071  303  2072 0
-2069  2070 -2071  303  2073 0
-2069  2070 -2071  303 -2074 0

c  -2-1 --> break 
c    ( b^{1, 303}_2 ∧  b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧ -p_303) -> break
c  in CNF:
c    -b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨  b^{1, 303}_0 ∨  p_303 ∨ break
c  in DIMACS:
-2069 -2070  2071  303 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 303}_2 ∧ -b^{1, 303}_1 ∧ -b^{1, 303}_0 ∧ true) 
c  in CNF:
c    -b^{1, 303}_2 ∨  b^{1, 303}_1 ∨  b^{1, 303}_0 ∨ false 
c  in DIMACS:
-2069  2070  2071  0

c  3 does not represent an automaton state.
c    -(-b^{1, 303}_2 ∧  b^{1, 303}_1 ∧  b^{1, 303}_0 ∧ true) 
c  in CNF:
c     b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ false 
c  in DIMACS:
 2069 -2070 -2071  0
c  -3 does not represent an automaton state.
c    -( b^{1, 303}_2 ∧  b^{1, 303}_1 ∧  b^{1, 303}_0 ∧ true) 
c  in CNF:
c    -b^{1, 303}_2 ∨ -b^{1, 303}_1 ∨ -b^{1, 303}_0 ∨ false 
c  in DIMACS:
-2069 -2070 -2071  0

c i = 304
c  -2+1 --> -1
c    ( b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧  p_304) -> ( b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0)
c  in CNF:
c    -b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨  b^{1, 305}_2
c    -b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_1
c    -b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨  b^{1, 305}_0
c  in DIMACS:
-2072 -2073  2074 -304  2075 0
-2072 -2073  2074 -304 -2076 0
-2072 -2073  2074 -304  2077 0

c  -1+1 --> 0
c    ( b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0 ∧  p_304) -> (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧ -b^{1, 305}_0)
c  in CNF:
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_2
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_1
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_0
c  in DIMACS:
-2072  2073 -2074 -304 -2075 0
-2072  2073 -2074 -304 -2076 0
-2072  2073 -2074 -304 -2077 0

c  0+1 --> 1
c    (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧  p_304) -> (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0)
c  in CNF:
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_2
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_1
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨  b^{1, 305}_0
c  in DIMACS:
 2072  2073  2074 -304 -2075 0
 2072  2073  2074 -304 -2076 0
 2072  2073  2074 -304  2077 0

c  1+1 --> 2
c    (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0 ∧  p_304) -> (-b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0)
c  in CNF:
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_2
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨  b^{1, 305}_1
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ -p_304 ∨ -b^{1, 305}_0
c  in DIMACS:
 2072  2073 -2074 -304 -2075 0
 2072  2073 -2074 -304  2076 0
 2072  2073 -2074 -304 -2077 0

c  2+1 --> break 
c    (-b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧  p_304) -> break
c  in CNF:
c     b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 2072 -2073  2074 -304 1162 0


c  2-1 --> 1
c    (-b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧ -p_304) -> (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0)
c  in CNF:
c     b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_2
c     b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_1
c     b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨  b^{1, 305}_0
c  in DIMACS:
 2072 -2073  2074  304 -2075 0
 2072 -2073  2074  304 -2076 0
 2072 -2073  2074  304  2077 0

c  1-1 --> 0
c    (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0 ∧ -p_304) -> (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧ -b^{1, 305}_0)
c  in CNF:
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_2
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_1
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_0
c  in DIMACS:
 2072  2073 -2074  304 -2075 0
 2072  2073 -2074  304 -2076 0
 2072  2073 -2074  304 -2077 0

c  0-1 --> -1
c    (-b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧ -p_304) -> ( b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0)
c  in CNF:
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨  b^{1, 305}_2
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_1
c     b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨  b^{1, 305}_0
c  in DIMACS:
 2072  2073  2074  304  2075 0
 2072  2073  2074  304 -2076 0
 2072  2073  2074  304  2077 0

c  -1-1 --> -2
c    ( b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧  b^{1, 304}_0 ∧ -p_304) -> ( b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0)
c  in CNF:
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨  b^{1, 305}_2
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨  b^{1, 305}_1
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨  p_304 ∨ -b^{1, 305}_0
c  in DIMACS:
-2072  2073 -2074  304  2075 0
-2072  2073 -2074  304  2076 0
-2072  2073 -2074  304 -2077 0

c  -2-1 --> break 
c    ( b^{1, 304}_2 ∧  b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨  b^{1, 304}_0 ∨  p_304 ∨ break
c  in DIMACS:
-2072 -2073  2074  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 304}_2 ∧ -b^{1, 304}_1 ∧ -b^{1, 304}_0 ∧ true) 
c  in CNF:
c    -b^{1, 304}_2 ∨  b^{1, 304}_1 ∨  b^{1, 304}_0 ∨ false 
c  in DIMACS:
-2072  2073  2074  0

c  3 does not represent an automaton state.
c    -(-b^{1, 304}_2 ∧  b^{1, 304}_1 ∧  b^{1, 304}_0 ∧ true) 
c  in CNF:
c     b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ false 
c  in DIMACS:
 2072 -2073 -2074  0
c  -3 does not represent an automaton state.
c    -( b^{1, 304}_2 ∧  b^{1, 304}_1 ∧  b^{1, 304}_0 ∧ true) 
c  in CNF:
c    -b^{1, 304}_2 ∨ -b^{1, 304}_1 ∨ -b^{1, 304}_0 ∨ false 
c  in DIMACS:
-2072 -2073 -2074  0

c i = 305
c  -2+1 --> -1
c    ( b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧  p_305) -> ( b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0)
c  in CNF:
c    -b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨  b^{1, 306}_2
c    -b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_1
c    -b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨  b^{1, 306}_0
c  in DIMACS:
-2075 -2076  2077 -305  2078 0
-2075 -2076  2077 -305 -2079 0
-2075 -2076  2077 -305  2080 0

c  -1+1 --> 0
c    ( b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0 ∧  p_305) -> (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧ -b^{1, 306}_0)
c  in CNF:
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_2
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_1
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_0
c  in DIMACS:
-2075  2076 -2077 -305 -2078 0
-2075  2076 -2077 -305 -2079 0
-2075  2076 -2077 -305 -2080 0

c  0+1 --> 1
c    (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧  p_305) -> (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0)
c  in CNF:
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_2
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_1
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨  b^{1, 306}_0
c  in DIMACS:
 2075  2076  2077 -305 -2078 0
 2075  2076  2077 -305 -2079 0
 2075  2076  2077 -305  2080 0

c  1+1 --> 2
c    (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0 ∧  p_305) -> (-b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0)
c  in CNF:
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_2
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨  b^{1, 306}_1
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ -p_305 ∨ -b^{1, 306}_0
c  in DIMACS:
 2075  2076 -2077 -305 -2078 0
 2075  2076 -2077 -305  2079 0
 2075  2076 -2077 -305 -2080 0

c  2+1 --> break 
c    (-b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧  p_305) -> break
c  in CNF:
c     b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ -p_305 ∨ break
c  in DIMACS:
 2075 -2076  2077 -305 1162 0


c  2-1 --> 1
c    (-b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧ -p_305) -> (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0)
c  in CNF:
c     b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_2
c     b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_1
c     b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨  b^{1, 306}_0
c  in DIMACS:
 2075 -2076  2077  305 -2078 0
 2075 -2076  2077  305 -2079 0
 2075 -2076  2077  305  2080 0

c  1-1 --> 0
c    (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0 ∧ -p_305) -> (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧ -b^{1, 306}_0)
c  in CNF:
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_2
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_1
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_0
c  in DIMACS:
 2075  2076 -2077  305 -2078 0
 2075  2076 -2077  305 -2079 0
 2075  2076 -2077  305 -2080 0

c  0-1 --> -1
c    (-b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧ -p_305) -> ( b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0)
c  in CNF:
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨  b^{1, 306}_2
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_1
c     b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨  b^{1, 306}_0
c  in DIMACS:
 2075  2076  2077  305  2078 0
 2075  2076  2077  305 -2079 0
 2075  2076  2077  305  2080 0

c  -1-1 --> -2
c    ( b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧  b^{1, 305}_0 ∧ -p_305) -> ( b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0)
c  in CNF:
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨  b^{1, 306}_2
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨  b^{1, 306}_1
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨  p_305 ∨ -b^{1, 306}_0
c  in DIMACS:
-2075  2076 -2077  305  2078 0
-2075  2076 -2077  305  2079 0
-2075  2076 -2077  305 -2080 0

c  -2-1 --> break 
c    ( b^{1, 305}_2 ∧  b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧ -p_305) -> break
c  in CNF:
c    -b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨  b^{1, 305}_0 ∨  p_305 ∨ break
c  in DIMACS:
-2075 -2076  2077  305 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 305}_2 ∧ -b^{1, 305}_1 ∧ -b^{1, 305}_0 ∧ true) 
c  in CNF:
c    -b^{1, 305}_2 ∨  b^{1, 305}_1 ∨  b^{1, 305}_0 ∨ false 
c  in DIMACS:
-2075  2076  2077  0

c  3 does not represent an automaton state.
c    -(-b^{1, 305}_2 ∧  b^{1, 305}_1 ∧  b^{1, 305}_0 ∧ true) 
c  in CNF:
c     b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ false 
c  in DIMACS:
 2075 -2076 -2077  0
c  -3 does not represent an automaton state.
c    -( b^{1, 305}_2 ∧  b^{1, 305}_1 ∧  b^{1, 305}_0 ∧ true) 
c  in CNF:
c    -b^{1, 305}_2 ∨ -b^{1, 305}_1 ∨ -b^{1, 305}_0 ∨ false 
c  in DIMACS:
-2075 -2076 -2077  0

c i = 306
c  -2+1 --> -1
c    ( b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧  p_306) -> ( b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0)
c  in CNF:
c    -b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨  b^{1, 307}_2
c    -b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_1
c    -b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨  b^{1, 307}_0
c  in DIMACS:
-2078 -2079  2080 -306  2081 0
-2078 -2079  2080 -306 -2082 0
-2078 -2079  2080 -306  2083 0

c  -1+1 --> 0
c    ( b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0 ∧  p_306) -> (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧ -b^{1, 307}_0)
c  in CNF:
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_2
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_1
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_0
c  in DIMACS:
-2078  2079 -2080 -306 -2081 0
-2078  2079 -2080 -306 -2082 0
-2078  2079 -2080 -306 -2083 0

c  0+1 --> 1
c    (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧  p_306) -> (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0)
c  in CNF:
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_2
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_1
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨  b^{1, 307}_0
c  in DIMACS:
 2078  2079  2080 -306 -2081 0
 2078  2079  2080 -306 -2082 0
 2078  2079  2080 -306  2083 0

c  1+1 --> 2
c    (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0 ∧  p_306) -> (-b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0)
c  in CNF:
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_2
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨  b^{1, 307}_1
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ -p_306 ∨ -b^{1, 307}_0
c  in DIMACS:
 2078  2079 -2080 -306 -2081 0
 2078  2079 -2080 -306  2082 0
 2078  2079 -2080 -306 -2083 0

c  2+1 --> break 
c    (-b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧  p_306) -> break
c  in CNF:
c     b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 2078 -2079  2080 -306 1162 0


c  2-1 --> 1
c    (-b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧ -p_306) -> (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0)
c  in CNF:
c     b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_2
c     b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_1
c     b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨  b^{1, 307}_0
c  in DIMACS:
 2078 -2079  2080  306 -2081 0
 2078 -2079  2080  306 -2082 0
 2078 -2079  2080  306  2083 0

c  1-1 --> 0
c    (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0 ∧ -p_306) -> (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧ -b^{1, 307}_0)
c  in CNF:
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_2
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_1
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_0
c  in DIMACS:
 2078  2079 -2080  306 -2081 0
 2078  2079 -2080  306 -2082 0
 2078  2079 -2080  306 -2083 0

c  0-1 --> -1
c    (-b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧ -p_306) -> ( b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0)
c  in CNF:
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨  b^{1, 307}_2
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_1
c     b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨  b^{1, 307}_0
c  in DIMACS:
 2078  2079  2080  306  2081 0
 2078  2079  2080  306 -2082 0
 2078  2079  2080  306  2083 0

c  -1-1 --> -2
c    ( b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧  b^{1, 306}_0 ∧ -p_306) -> ( b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0)
c  in CNF:
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨  b^{1, 307}_2
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨  b^{1, 307}_1
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨  p_306 ∨ -b^{1, 307}_0
c  in DIMACS:
-2078  2079 -2080  306  2081 0
-2078  2079 -2080  306  2082 0
-2078  2079 -2080  306 -2083 0

c  -2-1 --> break 
c    ( b^{1, 306}_2 ∧  b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨  b^{1, 306}_0 ∨  p_306 ∨ break
c  in DIMACS:
-2078 -2079  2080  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 306}_2 ∧ -b^{1, 306}_1 ∧ -b^{1, 306}_0 ∧ true) 
c  in CNF:
c    -b^{1, 306}_2 ∨  b^{1, 306}_1 ∨  b^{1, 306}_0 ∨ false 
c  in DIMACS:
-2078  2079  2080  0

c  3 does not represent an automaton state.
c    -(-b^{1, 306}_2 ∧  b^{1, 306}_1 ∧  b^{1, 306}_0 ∧ true) 
c  in CNF:
c     b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ false 
c  in DIMACS:
 2078 -2079 -2080  0
c  -3 does not represent an automaton state.
c    -( b^{1, 306}_2 ∧  b^{1, 306}_1 ∧  b^{1, 306}_0 ∧ true) 
c  in CNF:
c    -b^{1, 306}_2 ∨ -b^{1, 306}_1 ∨ -b^{1, 306}_0 ∨ false 
c  in DIMACS:
-2078 -2079 -2080  0

c i = 307
c  -2+1 --> -1
c    ( b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧  p_307) -> ( b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0)
c  in CNF:
c    -b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨  b^{1, 308}_2
c    -b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_1
c    -b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨  b^{1, 308}_0
c  in DIMACS:
-2081 -2082  2083 -307  2084 0
-2081 -2082  2083 -307 -2085 0
-2081 -2082  2083 -307  2086 0

c  -1+1 --> 0
c    ( b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0 ∧  p_307) -> (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧ -b^{1, 308}_0)
c  in CNF:
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_2
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_1
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_0
c  in DIMACS:
-2081  2082 -2083 -307 -2084 0
-2081  2082 -2083 -307 -2085 0
-2081  2082 -2083 -307 -2086 0

c  0+1 --> 1
c    (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧  p_307) -> (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0)
c  in CNF:
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_2
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_1
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨  b^{1, 308}_0
c  in DIMACS:
 2081  2082  2083 -307 -2084 0
 2081  2082  2083 -307 -2085 0
 2081  2082  2083 -307  2086 0

c  1+1 --> 2
c    (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0 ∧  p_307) -> (-b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0)
c  in CNF:
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_2
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨  b^{1, 308}_1
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ -p_307 ∨ -b^{1, 308}_0
c  in DIMACS:
 2081  2082 -2083 -307 -2084 0
 2081  2082 -2083 -307  2085 0
 2081  2082 -2083 -307 -2086 0

c  2+1 --> break 
c    (-b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧  p_307) -> break
c  in CNF:
c     b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ -p_307 ∨ break
c  in DIMACS:
 2081 -2082  2083 -307 1162 0


c  2-1 --> 1
c    (-b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧ -p_307) -> (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0)
c  in CNF:
c     b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_2
c     b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_1
c     b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨  b^{1, 308}_0
c  in DIMACS:
 2081 -2082  2083  307 -2084 0
 2081 -2082  2083  307 -2085 0
 2081 -2082  2083  307  2086 0

c  1-1 --> 0
c    (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0 ∧ -p_307) -> (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧ -b^{1, 308}_0)
c  in CNF:
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_2
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_1
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_0
c  in DIMACS:
 2081  2082 -2083  307 -2084 0
 2081  2082 -2083  307 -2085 0
 2081  2082 -2083  307 -2086 0

c  0-1 --> -1
c    (-b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧ -p_307) -> ( b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0)
c  in CNF:
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨  b^{1, 308}_2
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_1
c     b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨  b^{1, 308}_0
c  in DIMACS:
 2081  2082  2083  307  2084 0
 2081  2082  2083  307 -2085 0
 2081  2082  2083  307  2086 0

c  -1-1 --> -2
c    ( b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧  b^{1, 307}_0 ∧ -p_307) -> ( b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0)
c  in CNF:
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨  b^{1, 308}_2
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨  b^{1, 308}_1
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨  p_307 ∨ -b^{1, 308}_0
c  in DIMACS:
-2081  2082 -2083  307  2084 0
-2081  2082 -2083  307  2085 0
-2081  2082 -2083  307 -2086 0

c  -2-1 --> break 
c    ( b^{1, 307}_2 ∧  b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧ -p_307) -> break
c  in CNF:
c    -b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨  b^{1, 307}_0 ∨  p_307 ∨ break
c  in DIMACS:
-2081 -2082  2083  307 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 307}_2 ∧ -b^{1, 307}_1 ∧ -b^{1, 307}_0 ∧ true) 
c  in CNF:
c    -b^{1, 307}_2 ∨  b^{1, 307}_1 ∨  b^{1, 307}_0 ∨ false 
c  in DIMACS:
-2081  2082  2083  0

c  3 does not represent an automaton state.
c    -(-b^{1, 307}_2 ∧  b^{1, 307}_1 ∧  b^{1, 307}_0 ∧ true) 
c  in CNF:
c     b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ false 
c  in DIMACS:
 2081 -2082 -2083  0
c  -3 does not represent an automaton state.
c    -( b^{1, 307}_2 ∧  b^{1, 307}_1 ∧  b^{1, 307}_0 ∧ true) 
c  in CNF:
c    -b^{1, 307}_2 ∨ -b^{1, 307}_1 ∨ -b^{1, 307}_0 ∨ false 
c  in DIMACS:
-2081 -2082 -2083  0

c i = 308
c  -2+1 --> -1
c    ( b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧  p_308) -> ( b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0)
c  in CNF:
c    -b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨  b^{1, 309}_2
c    -b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_1
c    -b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨  b^{1, 309}_0
c  in DIMACS:
-2084 -2085  2086 -308  2087 0
-2084 -2085  2086 -308 -2088 0
-2084 -2085  2086 -308  2089 0

c  -1+1 --> 0
c    ( b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0 ∧  p_308) -> (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧ -b^{1, 309}_0)
c  in CNF:
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_2
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_1
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_0
c  in DIMACS:
-2084  2085 -2086 -308 -2087 0
-2084  2085 -2086 -308 -2088 0
-2084  2085 -2086 -308 -2089 0

c  0+1 --> 1
c    (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧  p_308) -> (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0)
c  in CNF:
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_2
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_1
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨  b^{1, 309}_0
c  in DIMACS:
 2084  2085  2086 -308 -2087 0
 2084  2085  2086 -308 -2088 0
 2084  2085  2086 -308  2089 0

c  1+1 --> 2
c    (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0 ∧  p_308) -> (-b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0)
c  in CNF:
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_2
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨  b^{1, 309}_1
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ -p_308 ∨ -b^{1, 309}_0
c  in DIMACS:
 2084  2085 -2086 -308 -2087 0
 2084  2085 -2086 -308  2088 0
 2084  2085 -2086 -308 -2089 0

c  2+1 --> break 
c    (-b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧  p_308) -> break
c  in CNF:
c     b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 2084 -2085  2086 -308 1162 0


c  2-1 --> 1
c    (-b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧ -p_308) -> (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0)
c  in CNF:
c     b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_2
c     b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_1
c     b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨  b^{1, 309}_0
c  in DIMACS:
 2084 -2085  2086  308 -2087 0
 2084 -2085  2086  308 -2088 0
 2084 -2085  2086  308  2089 0

c  1-1 --> 0
c    (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0 ∧ -p_308) -> (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧ -b^{1, 309}_0)
c  in CNF:
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_2
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_1
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_0
c  in DIMACS:
 2084  2085 -2086  308 -2087 0
 2084  2085 -2086  308 -2088 0
 2084  2085 -2086  308 -2089 0

c  0-1 --> -1
c    (-b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧ -p_308) -> ( b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0)
c  in CNF:
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨  b^{1, 309}_2
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_1
c     b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨  b^{1, 309}_0
c  in DIMACS:
 2084  2085  2086  308  2087 0
 2084  2085  2086  308 -2088 0
 2084  2085  2086  308  2089 0

c  -1-1 --> -2
c    ( b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧  b^{1, 308}_0 ∧ -p_308) -> ( b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0)
c  in CNF:
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨  b^{1, 309}_2
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨  b^{1, 309}_1
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨  p_308 ∨ -b^{1, 309}_0
c  in DIMACS:
-2084  2085 -2086  308  2087 0
-2084  2085 -2086  308  2088 0
-2084  2085 -2086  308 -2089 0

c  -2-1 --> break 
c    ( b^{1, 308}_2 ∧  b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨  b^{1, 308}_0 ∨  p_308 ∨ break
c  in DIMACS:
-2084 -2085  2086  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 308}_2 ∧ -b^{1, 308}_1 ∧ -b^{1, 308}_0 ∧ true) 
c  in CNF:
c    -b^{1, 308}_2 ∨  b^{1, 308}_1 ∨  b^{1, 308}_0 ∨ false 
c  in DIMACS:
-2084  2085  2086  0

c  3 does not represent an automaton state.
c    -(-b^{1, 308}_2 ∧  b^{1, 308}_1 ∧  b^{1, 308}_0 ∧ true) 
c  in CNF:
c     b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ false 
c  in DIMACS:
 2084 -2085 -2086  0
c  -3 does not represent an automaton state.
c    -( b^{1, 308}_2 ∧  b^{1, 308}_1 ∧  b^{1, 308}_0 ∧ true) 
c  in CNF:
c    -b^{1, 308}_2 ∨ -b^{1, 308}_1 ∨ -b^{1, 308}_0 ∨ false 
c  in DIMACS:
-2084 -2085 -2086  0

c i = 309
c  -2+1 --> -1
c    ( b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧  p_309) -> ( b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0)
c  in CNF:
c    -b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨  b^{1, 310}_2
c    -b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_1
c    -b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨  b^{1, 310}_0
c  in DIMACS:
-2087 -2088  2089 -309  2090 0
-2087 -2088  2089 -309 -2091 0
-2087 -2088  2089 -309  2092 0

c  -1+1 --> 0
c    ( b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0 ∧  p_309) -> (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧ -b^{1, 310}_0)
c  in CNF:
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_2
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_1
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_0
c  in DIMACS:
-2087  2088 -2089 -309 -2090 0
-2087  2088 -2089 -309 -2091 0
-2087  2088 -2089 -309 -2092 0

c  0+1 --> 1
c    (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧  p_309) -> (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0)
c  in CNF:
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_2
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_1
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨  b^{1, 310}_0
c  in DIMACS:
 2087  2088  2089 -309 -2090 0
 2087  2088  2089 -309 -2091 0
 2087  2088  2089 -309  2092 0

c  1+1 --> 2
c    (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0 ∧  p_309) -> (-b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0)
c  in CNF:
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_2
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨  b^{1, 310}_1
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ -p_309 ∨ -b^{1, 310}_0
c  in DIMACS:
 2087  2088 -2089 -309 -2090 0
 2087  2088 -2089 -309  2091 0
 2087  2088 -2089 -309 -2092 0

c  2+1 --> break 
c    (-b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧  p_309) -> break
c  in CNF:
c     b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ -p_309 ∨ break
c  in DIMACS:
 2087 -2088  2089 -309 1162 0


c  2-1 --> 1
c    (-b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧ -p_309) -> (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0)
c  in CNF:
c     b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_2
c     b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_1
c     b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨  b^{1, 310}_0
c  in DIMACS:
 2087 -2088  2089  309 -2090 0
 2087 -2088  2089  309 -2091 0
 2087 -2088  2089  309  2092 0

c  1-1 --> 0
c    (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0 ∧ -p_309) -> (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧ -b^{1, 310}_0)
c  in CNF:
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_2
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_1
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_0
c  in DIMACS:
 2087  2088 -2089  309 -2090 0
 2087  2088 -2089  309 -2091 0
 2087  2088 -2089  309 -2092 0

c  0-1 --> -1
c    (-b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧ -p_309) -> ( b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0)
c  in CNF:
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨  b^{1, 310}_2
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_1
c     b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨  b^{1, 310}_0
c  in DIMACS:
 2087  2088  2089  309  2090 0
 2087  2088  2089  309 -2091 0
 2087  2088  2089  309  2092 0

c  -1-1 --> -2
c    ( b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧  b^{1, 309}_0 ∧ -p_309) -> ( b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0)
c  in CNF:
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨  b^{1, 310}_2
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨  b^{1, 310}_1
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨  p_309 ∨ -b^{1, 310}_0
c  in DIMACS:
-2087  2088 -2089  309  2090 0
-2087  2088 -2089  309  2091 0
-2087  2088 -2089  309 -2092 0

c  -2-1 --> break 
c    ( b^{1, 309}_2 ∧  b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧ -p_309) -> break
c  in CNF:
c    -b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨  b^{1, 309}_0 ∨  p_309 ∨ break
c  in DIMACS:
-2087 -2088  2089  309 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 309}_2 ∧ -b^{1, 309}_1 ∧ -b^{1, 309}_0 ∧ true) 
c  in CNF:
c    -b^{1, 309}_2 ∨  b^{1, 309}_1 ∨  b^{1, 309}_0 ∨ false 
c  in DIMACS:
-2087  2088  2089  0

c  3 does not represent an automaton state.
c    -(-b^{1, 309}_2 ∧  b^{1, 309}_1 ∧  b^{1, 309}_0 ∧ true) 
c  in CNF:
c     b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ false 
c  in DIMACS:
 2087 -2088 -2089  0
c  -3 does not represent an automaton state.
c    -( b^{1, 309}_2 ∧  b^{1, 309}_1 ∧  b^{1, 309}_0 ∧ true) 
c  in CNF:
c    -b^{1, 309}_2 ∨ -b^{1, 309}_1 ∨ -b^{1, 309}_0 ∨ false 
c  in DIMACS:
-2087 -2088 -2089  0

c i = 310
c  -2+1 --> -1
c    ( b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧  p_310) -> ( b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0)
c  in CNF:
c    -b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨  b^{1, 311}_2
c    -b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_1
c    -b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨  b^{1, 311}_0
c  in DIMACS:
-2090 -2091  2092 -310  2093 0
-2090 -2091  2092 -310 -2094 0
-2090 -2091  2092 -310  2095 0

c  -1+1 --> 0
c    ( b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0 ∧  p_310) -> (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧ -b^{1, 311}_0)
c  in CNF:
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_2
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_1
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_0
c  in DIMACS:
-2090  2091 -2092 -310 -2093 0
-2090  2091 -2092 -310 -2094 0
-2090  2091 -2092 -310 -2095 0

c  0+1 --> 1
c    (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧  p_310) -> (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0)
c  in CNF:
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_2
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_1
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨  b^{1, 311}_0
c  in DIMACS:
 2090  2091  2092 -310 -2093 0
 2090  2091  2092 -310 -2094 0
 2090  2091  2092 -310  2095 0

c  1+1 --> 2
c    (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0 ∧  p_310) -> (-b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0)
c  in CNF:
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_2
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨  b^{1, 311}_1
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ -p_310 ∨ -b^{1, 311}_0
c  in DIMACS:
 2090  2091 -2092 -310 -2093 0
 2090  2091 -2092 -310  2094 0
 2090  2091 -2092 -310 -2095 0

c  2+1 --> break 
c    (-b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧  p_310) -> break
c  in CNF:
c     b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 2090 -2091  2092 -310 1162 0


c  2-1 --> 1
c    (-b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧ -p_310) -> (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0)
c  in CNF:
c     b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_2
c     b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_1
c     b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨  b^{1, 311}_0
c  in DIMACS:
 2090 -2091  2092  310 -2093 0
 2090 -2091  2092  310 -2094 0
 2090 -2091  2092  310  2095 0

c  1-1 --> 0
c    (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0 ∧ -p_310) -> (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧ -b^{1, 311}_0)
c  in CNF:
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_2
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_1
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_0
c  in DIMACS:
 2090  2091 -2092  310 -2093 0
 2090  2091 -2092  310 -2094 0
 2090  2091 -2092  310 -2095 0

c  0-1 --> -1
c    (-b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧ -p_310) -> ( b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0)
c  in CNF:
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨  b^{1, 311}_2
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_1
c     b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨  b^{1, 311}_0
c  in DIMACS:
 2090  2091  2092  310  2093 0
 2090  2091  2092  310 -2094 0
 2090  2091  2092  310  2095 0

c  -1-1 --> -2
c    ( b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧  b^{1, 310}_0 ∧ -p_310) -> ( b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0)
c  in CNF:
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨  b^{1, 311}_2
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨  b^{1, 311}_1
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨  p_310 ∨ -b^{1, 311}_0
c  in DIMACS:
-2090  2091 -2092  310  2093 0
-2090  2091 -2092  310  2094 0
-2090  2091 -2092  310 -2095 0

c  -2-1 --> break 
c    ( b^{1, 310}_2 ∧  b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨  b^{1, 310}_0 ∨  p_310 ∨ break
c  in DIMACS:
-2090 -2091  2092  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 310}_2 ∧ -b^{1, 310}_1 ∧ -b^{1, 310}_0 ∧ true) 
c  in CNF:
c    -b^{1, 310}_2 ∨  b^{1, 310}_1 ∨  b^{1, 310}_0 ∨ false 
c  in DIMACS:
-2090  2091  2092  0

c  3 does not represent an automaton state.
c    -(-b^{1, 310}_2 ∧  b^{1, 310}_1 ∧  b^{1, 310}_0 ∧ true) 
c  in CNF:
c     b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ false 
c  in DIMACS:
 2090 -2091 -2092  0
c  -3 does not represent an automaton state.
c    -( b^{1, 310}_2 ∧  b^{1, 310}_1 ∧  b^{1, 310}_0 ∧ true) 
c  in CNF:
c    -b^{1, 310}_2 ∨ -b^{1, 310}_1 ∨ -b^{1, 310}_0 ∨ false 
c  in DIMACS:
-2090 -2091 -2092  0

c i = 311
c  -2+1 --> -1
c    ( b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧  p_311) -> ( b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0)
c  in CNF:
c    -b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨  b^{1, 312}_2
c    -b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_1
c    -b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨  b^{1, 312}_0
c  in DIMACS:
-2093 -2094  2095 -311  2096 0
-2093 -2094  2095 -311 -2097 0
-2093 -2094  2095 -311  2098 0

c  -1+1 --> 0
c    ( b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0 ∧  p_311) -> (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧ -b^{1, 312}_0)
c  in CNF:
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_2
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_1
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_0
c  in DIMACS:
-2093  2094 -2095 -311 -2096 0
-2093  2094 -2095 -311 -2097 0
-2093  2094 -2095 -311 -2098 0

c  0+1 --> 1
c    (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧  p_311) -> (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0)
c  in CNF:
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_2
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_1
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨  b^{1, 312}_0
c  in DIMACS:
 2093  2094  2095 -311 -2096 0
 2093  2094  2095 -311 -2097 0
 2093  2094  2095 -311  2098 0

c  1+1 --> 2
c    (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0 ∧  p_311) -> (-b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0)
c  in CNF:
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_2
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨  b^{1, 312}_1
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ -p_311 ∨ -b^{1, 312}_0
c  in DIMACS:
 2093  2094 -2095 -311 -2096 0
 2093  2094 -2095 -311  2097 0
 2093  2094 -2095 -311 -2098 0

c  2+1 --> break 
c    (-b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧  p_311) -> break
c  in CNF:
c     b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ -p_311 ∨ break
c  in DIMACS:
 2093 -2094  2095 -311 1162 0


c  2-1 --> 1
c    (-b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧ -p_311) -> (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0)
c  in CNF:
c     b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_2
c     b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_1
c     b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨  b^{1, 312}_0
c  in DIMACS:
 2093 -2094  2095  311 -2096 0
 2093 -2094  2095  311 -2097 0
 2093 -2094  2095  311  2098 0

c  1-1 --> 0
c    (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0 ∧ -p_311) -> (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧ -b^{1, 312}_0)
c  in CNF:
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_2
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_1
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_0
c  in DIMACS:
 2093  2094 -2095  311 -2096 0
 2093  2094 -2095  311 -2097 0
 2093  2094 -2095  311 -2098 0

c  0-1 --> -1
c    (-b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧ -p_311) -> ( b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0)
c  in CNF:
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨  b^{1, 312}_2
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_1
c     b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨  b^{1, 312}_0
c  in DIMACS:
 2093  2094  2095  311  2096 0
 2093  2094  2095  311 -2097 0
 2093  2094  2095  311  2098 0

c  -1-1 --> -2
c    ( b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧  b^{1, 311}_0 ∧ -p_311) -> ( b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0)
c  in CNF:
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨  b^{1, 312}_2
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨  b^{1, 312}_1
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨  p_311 ∨ -b^{1, 312}_0
c  in DIMACS:
-2093  2094 -2095  311  2096 0
-2093  2094 -2095  311  2097 0
-2093  2094 -2095  311 -2098 0

c  -2-1 --> break 
c    ( b^{1, 311}_2 ∧  b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧ -p_311) -> break
c  in CNF:
c    -b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨  b^{1, 311}_0 ∨  p_311 ∨ break
c  in DIMACS:
-2093 -2094  2095  311 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 311}_2 ∧ -b^{1, 311}_1 ∧ -b^{1, 311}_0 ∧ true) 
c  in CNF:
c    -b^{1, 311}_2 ∨  b^{1, 311}_1 ∨  b^{1, 311}_0 ∨ false 
c  in DIMACS:
-2093  2094  2095  0

c  3 does not represent an automaton state.
c    -(-b^{1, 311}_2 ∧  b^{1, 311}_1 ∧  b^{1, 311}_0 ∧ true) 
c  in CNF:
c     b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ false 
c  in DIMACS:
 2093 -2094 -2095  0
c  -3 does not represent an automaton state.
c    -( b^{1, 311}_2 ∧  b^{1, 311}_1 ∧  b^{1, 311}_0 ∧ true) 
c  in CNF:
c    -b^{1, 311}_2 ∨ -b^{1, 311}_1 ∨ -b^{1, 311}_0 ∨ false 
c  in DIMACS:
-2093 -2094 -2095  0

c i = 312
c  -2+1 --> -1
c    ( b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧  p_312) -> ( b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0)
c  in CNF:
c    -b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨  b^{1, 313}_2
c    -b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_1
c    -b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨  b^{1, 313}_0
c  in DIMACS:
-2096 -2097  2098 -312  2099 0
-2096 -2097  2098 -312 -2100 0
-2096 -2097  2098 -312  2101 0

c  -1+1 --> 0
c    ( b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0 ∧  p_312) -> (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧ -b^{1, 313}_0)
c  in CNF:
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_2
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_1
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_0
c  in DIMACS:
-2096  2097 -2098 -312 -2099 0
-2096  2097 -2098 -312 -2100 0
-2096  2097 -2098 -312 -2101 0

c  0+1 --> 1
c    (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧  p_312) -> (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0)
c  in CNF:
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_2
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_1
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨  b^{1, 313}_0
c  in DIMACS:
 2096  2097  2098 -312 -2099 0
 2096  2097  2098 -312 -2100 0
 2096  2097  2098 -312  2101 0

c  1+1 --> 2
c    (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0 ∧  p_312) -> (-b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0)
c  in CNF:
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_2
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨  b^{1, 313}_1
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ -p_312 ∨ -b^{1, 313}_0
c  in DIMACS:
 2096  2097 -2098 -312 -2099 0
 2096  2097 -2098 -312  2100 0
 2096  2097 -2098 -312 -2101 0

c  2+1 --> break 
c    (-b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧  p_312) -> break
c  in CNF:
c     b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 2096 -2097  2098 -312 1162 0


c  2-1 --> 1
c    (-b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧ -p_312) -> (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0)
c  in CNF:
c     b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_2
c     b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_1
c     b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨  b^{1, 313}_0
c  in DIMACS:
 2096 -2097  2098  312 -2099 0
 2096 -2097  2098  312 -2100 0
 2096 -2097  2098  312  2101 0

c  1-1 --> 0
c    (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0 ∧ -p_312) -> (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧ -b^{1, 313}_0)
c  in CNF:
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_2
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_1
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_0
c  in DIMACS:
 2096  2097 -2098  312 -2099 0
 2096  2097 -2098  312 -2100 0
 2096  2097 -2098  312 -2101 0

c  0-1 --> -1
c    (-b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧ -p_312) -> ( b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0)
c  in CNF:
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨  b^{1, 313}_2
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_1
c     b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨  b^{1, 313}_0
c  in DIMACS:
 2096  2097  2098  312  2099 0
 2096  2097  2098  312 -2100 0
 2096  2097  2098  312  2101 0

c  -1-1 --> -2
c    ( b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧  b^{1, 312}_0 ∧ -p_312) -> ( b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0)
c  in CNF:
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨  b^{1, 313}_2
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨  b^{1, 313}_1
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨  p_312 ∨ -b^{1, 313}_0
c  in DIMACS:
-2096  2097 -2098  312  2099 0
-2096  2097 -2098  312  2100 0
-2096  2097 -2098  312 -2101 0

c  -2-1 --> break 
c    ( b^{1, 312}_2 ∧  b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨  b^{1, 312}_0 ∨  p_312 ∨ break
c  in DIMACS:
-2096 -2097  2098  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 312}_2 ∧ -b^{1, 312}_1 ∧ -b^{1, 312}_0 ∧ true) 
c  in CNF:
c    -b^{1, 312}_2 ∨  b^{1, 312}_1 ∨  b^{1, 312}_0 ∨ false 
c  in DIMACS:
-2096  2097  2098  0

c  3 does not represent an automaton state.
c    -(-b^{1, 312}_2 ∧  b^{1, 312}_1 ∧  b^{1, 312}_0 ∧ true) 
c  in CNF:
c     b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ false 
c  in DIMACS:
 2096 -2097 -2098  0
c  -3 does not represent an automaton state.
c    -( b^{1, 312}_2 ∧  b^{1, 312}_1 ∧  b^{1, 312}_0 ∧ true) 
c  in CNF:
c    -b^{1, 312}_2 ∨ -b^{1, 312}_1 ∨ -b^{1, 312}_0 ∨ false 
c  in DIMACS:
-2096 -2097 -2098  0

c i = 313
c  -2+1 --> -1
c    ( b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧  p_313) -> ( b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0)
c  in CNF:
c    -b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨  b^{1, 314}_2
c    -b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_1
c    -b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨  b^{1, 314}_0
c  in DIMACS:
-2099 -2100  2101 -313  2102 0
-2099 -2100  2101 -313 -2103 0
-2099 -2100  2101 -313  2104 0

c  -1+1 --> 0
c    ( b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0 ∧  p_313) -> (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧ -b^{1, 314}_0)
c  in CNF:
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_2
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_1
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_0
c  in DIMACS:
-2099  2100 -2101 -313 -2102 0
-2099  2100 -2101 -313 -2103 0
-2099  2100 -2101 -313 -2104 0

c  0+1 --> 1
c    (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧  p_313) -> (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0)
c  in CNF:
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_2
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_1
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨  b^{1, 314}_0
c  in DIMACS:
 2099  2100  2101 -313 -2102 0
 2099  2100  2101 -313 -2103 0
 2099  2100  2101 -313  2104 0

c  1+1 --> 2
c    (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0 ∧  p_313) -> (-b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0)
c  in CNF:
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_2
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨  b^{1, 314}_1
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ -p_313 ∨ -b^{1, 314}_0
c  in DIMACS:
 2099  2100 -2101 -313 -2102 0
 2099  2100 -2101 -313  2103 0
 2099  2100 -2101 -313 -2104 0

c  2+1 --> break 
c    (-b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧  p_313) -> break
c  in CNF:
c     b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ -p_313 ∨ break
c  in DIMACS:
 2099 -2100  2101 -313 1162 0


c  2-1 --> 1
c    (-b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧ -p_313) -> (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0)
c  in CNF:
c     b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_2
c     b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_1
c     b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨  b^{1, 314}_0
c  in DIMACS:
 2099 -2100  2101  313 -2102 0
 2099 -2100  2101  313 -2103 0
 2099 -2100  2101  313  2104 0

c  1-1 --> 0
c    (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0 ∧ -p_313) -> (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧ -b^{1, 314}_0)
c  in CNF:
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_2
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_1
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_0
c  in DIMACS:
 2099  2100 -2101  313 -2102 0
 2099  2100 -2101  313 -2103 0
 2099  2100 -2101  313 -2104 0

c  0-1 --> -1
c    (-b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧ -p_313) -> ( b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0)
c  in CNF:
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨  b^{1, 314}_2
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_1
c     b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨  b^{1, 314}_0
c  in DIMACS:
 2099  2100  2101  313  2102 0
 2099  2100  2101  313 -2103 0
 2099  2100  2101  313  2104 0

c  -1-1 --> -2
c    ( b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧  b^{1, 313}_0 ∧ -p_313) -> ( b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0)
c  in CNF:
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨  b^{1, 314}_2
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨  b^{1, 314}_1
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨  p_313 ∨ -b^{1, 314}_0
c  in DIMACS:
-2099  2100 -2101  313  2102 0
-2099  2100 -2101  313  2103 0
-2099  2100 -2101  313 -2104 0

c  -2-1 --> break 
c    ( b^{1, 313}_2 ∧  b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧ -p_313) -> break
c  in CNF:
c    -b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨  b^{1, 313}_0 ∨  p_313 ∨ break
c  in DIMACS:
-2099 -2100  2101  313 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 313}_2 ∧ -b^{1, 313}_1 ∧ -b^{1, 313}_0 ∧ true) 
c  in CNF:
c    -b^{1, 313}_2 ∨  b^{1, 313}_1 ∨  b^{1, 313}_0 ∨ false 
c  in DIMACS:
-2099  2100  2101  0

c  3 does not represent an automaton state.
c    -(-b^{1, 313}_2 ∧  b^{1, 313}_1 ∧  b^{1, 313}_0 ∧ true) 
c  in CNF:
c     b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ false 
c  in DIMACS:
 2099 -2100 -2101  0
c  -3 does not represent an automaton state.
c    -( b^{1, 313}_2 ∧  b^{1, 313}_1 ∧  b^{1, 313}_0 ∧ true) 
c  in CNF:
c    -b^{1, 313}_2 ∨ -b^{1, 313}_1 ∨ -b^{1, 313}_0 ∨ false 
c  in DIMACS:
-2099 -2100 -2101  0

c i = 314
c  -2+1 --> -1
c    ( b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧  p_314) -> ( b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0)
c  in CNF:
c    -b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨  b^{1, 315}_2
c    -b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_1
c    -b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨  b^{1, 315}_0
c  in DIMACS:
-2102 -2103  2104 -314  2105 0
-2102 -2103  2104 -314 -2106 0
-2102 -2103  2104 -314  2107 0

c  -1+1 --> 0
c    ( b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0 ∧  p_314) -> (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧ -b^{1, 315}_0)
c  in CNF:
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_2
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_1
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_0
c  in DIMACS:
-2102  2103 -2104 -314 -2105 0
-2102  2103 -2104 -314 -2106 0
-2102  2103 -2104 -314 -2107 0

c  0+1 --> 1
c    (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧  p_314) -> (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0)
c  in CNF:
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_2
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_1
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨  b^{1, 315}_0
c  in DIMACS:
 2102  2103  2104 -314 -2105 0
 2102  2103  2104 -314 -2106 0
 2102  2103  2104 -314  2107 0

c  1+1 --> 2
c    (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0 ∧  p_314) -> (-b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0)
c  in CNF:
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_2
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨  b^{1, 315}_1
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ -p_314 ∨ -b^{1, 315}_0
c  in DIMACS:
 2102  2103 -2104 -314 -2105 0
 2102  2103 -2104 -314  2106 0
 2102  2103 -2104 -314 -2107 0

c  2+1 --> break 
c    (-b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧  p_314) -> break
c  in CNF:
c     b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ -p_314 ∨ break
c  in DIMACS:
 2102 -2103  2104 -314 1162 0


c  2-1 --> 1
c    (-b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧ -p_314) -> (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0)
c  in CNF:
c     b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_2
c     b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_1
c     b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨  b^{1, 315}_0
c  in DIMACS:
 2102 -2103  2104  314 -2105 0
 2102 -2103  2104  314 -2106 0
 2102 -2103  2104  314  2107 0

c  1-1 --> 0
c    (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0 ∧ -p_314) -> (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧ -b^{1, 315}_0)
c  in CNF:
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_2
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_1
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_0
c  in DIMACS:
 2102  2103 -2104  314 -2105 0
 2102  2103 -2104  314 -2106 0
 2102  2103 -2104  314 -2107 0

c  0-1 --> -1
c    (-b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧ -p_314) -> ( b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0)
c  in CNF:
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨  b^{1, 315}_2
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_1
c     b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨  b^{1, 315}_0
c  in DIMACS:
 2102  2103  2104  314  2105 0
 2102  2103  2104  314 -2106 0
 2102  2103  2104  314  2107 0

c  -1-1 --> -2
c    ( b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧  b^{1, 314}_0 ∧ -p_314) -> ( b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0)
c  in CNF:
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨  b^{1, 315}_2
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨  b^{1, 315}_1
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨  p_314 ∨ -b^{1, 315}_0
c  in DIMACS:
-2102  2103 -2104  314  2105 0
-2102  2103 -2104  314  2106 0
-2102  2103 -2104  314 -2107 0

c  -2-1 --> break 
c    ( b^{1, 314}_2 ∧  b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧ -p_314) -> break
c  in CNF:
c    -b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨  b^{1, 314}_0 ∨  p_314 ∨ break
c  in DIMACS:
-2102 -2103  2104  314 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 314}_2 ∧ -b^{1, 314}_1 ∧ -b^{1, 314}_0 ∧ true) 
c  in CNF:
c    -b^{1, 314}_2 ∨  b^{1, 314}_1 ∨  b^{1, 314}_0 ∨ false 
c  in DIMACS:
-2102  2103  2104  0

c  3 does not represent an automaton state.
c    -(-b^{1, 314}_2 ∧  b^{1, 314}_1 ∧  b^{1, 314}_0 ∧ true) 
c  in CNF:
c     b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ false 
c  in DIMACS:
 2102 -2103 -2104  0
c  -3 does not represent an automaton state.
c    -( b^{1, 314}_2 ∧  b^{1, 314}_1 ∧  b^{1, 314}_0 ∧ true) 
c  in CNF:
c    -b^{1, 314}_2 ∨ -b^{1, 314}_1 ∨ -b^{1, 314}_0 ∨ false 
c  in DIMACS:
-2102 -2103 -2104  0

c i = 315
c  -2+1 --> -1
c    ( b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧  p_315) -> ( b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0)
c  in CNF:
c    -b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨  b^{1, 316}_2
c    -b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_1
c    -b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨  b^{1, 316}_0
c  in DIMACS:
-2105 -2106  2107 -315  2108 0
-2105 -2106  2107 -315 -2109 0
-2105 -2106  2107 -315  2110 0

c  -1+1 --> 0
c    ( b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0 ∧  p_315) -> (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧ -b^{1, 316}_0)
c  in CNF:
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_2
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_1
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_0
c  in DIMACS:
-2105  2106 -2107 -315 -2108 0
-2105  2106 -2107 -315 -2109 0
-2105  2106 -2107 -315 -2110 0

c  0+1 --> 1
c    (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧  p_315) -> (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0)
c  in CNF:
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_2
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_1
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨  b^{1, 316}_0
c  in DIMACS:
 2105  2106  2107 -315 -2108 0
 2105  2106  2107 -315 -2109 0
 2105  2106  2107 -315  2110 0

c  1+1 --> 2
c    (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0 ∧  p_315) -> (-b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0)
c  in CNF:
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_2
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨  b^{1, 316}_1
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ -p_315 ∨ -b^{1, 316}_0
c  in DIMACS:
 2105  2106 -2107 -315 -2108 0
 2105  2106 -2107 -315  2109 0
 2105  2106 -2107 -315 -2110 0

c  2+1 --> break 
c    (-b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧  p_315) -> break
c  in CNF:
c     b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 2105 -2106  2107 -315 1162 0


c  2-1 --> 1
c    (-b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧ -p_315) -> (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0)
c  in CNF:
c     b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_2
c     b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_1
c     b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨  b^{1, 316}_0
c  in DIMACS:
 2105 -2106  2107  315 -2108 0
 2105 -2106  2107  315 -2109 0
 2105 -2106  2107  315  2110 0

c  1-1 --> 0
c    (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0 ∧ -p_315) -> (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧ -b^{1, 316}_0)
c  in CNF:
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_2
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_1
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_0
c  in DIMACS:
 2105  2106 -2107  315 -2108 0
 2105  2106 -2107  315 -2109 0
 2105  2106 -2107  315 -2110 0

c  0-1 --> -1
c    (-b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧ -p_315) -> ( b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0)
c  in CNF:
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨  b^{1, 316}_2
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_1
c     b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨  b^{1, 316}_0
c  in DIMACS:
 2105  2106  2107  315  2108 0
 2105  2106  2107  315 -2109 0
 2105  2106  2107  315  2110 0

c  -1-1 --> -2
c    ( b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧  b^{1, 315}_0 ∧ -p_315) -> ( b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0)
c  in CNF:
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨  b^{1, 316}_2
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨  b^{1, 316}_1
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨  p_315 ∨ -b^{1, 316}_0
c  in DIMACS:
-2105  2106 -2107  315  2108 0
-2105  2106 -2107  315  2109 0
-2105  2106 -2107  315 -2110 0

c  -2-1 --> break 
c    ( b^{1, 315}_2 ∧  b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨  b^{1, 315}_0 ∨  p_315 ∨ break
c  in DIMACS:
-2105 -2106  2107  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 315}_2 ∧ -b^{1, 315}_1 ∧ -b^{1, 315}_0 ∧ true) 
c  in CNF:
c    -b^{1, 315}_2 ∨  b^{1, 315}_1 ∨  b^{1, 315}_0 ∨ false 
c  in DIMACS:
-2105  2106  2107  0

c  3 does not represent an automaton state.
c    -(-b^{1, 315}_2 ∧  b^{1, 315}_1 ∧  b^{1, 315}_0 ∧ true) 
c  in CNF:
c     b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ false 
c  in DIMACS:
 2105 -2106 -2107  0
c  -3 does not represent an automaton state.
c    -( b^{1, 315}_2 ∧  b^{1, 315}_1 ∧  b^{1, 315}_0 ∧ true) 
c  in CNF:
c    -b^{1, 315}_2 ∨ -b^{1, 315}_1 ∨ -b^{1, 315}_0 ∨ false 
c  in DIMACS:
-2105 -2106 -2107  0

c i = 316
c  -2+1 --> -1
c    ( b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧  p_316) -> ( b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0)
c  in CNF:
c    -b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨  b^{1, 317}_2
c    -b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_1
c    -b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨  b^{1, 317}_0
c  in DIMACS:
-2108 -2109  2110 -316  2111 0
-2108 -2109  2110 -316 -2112 0
-2108 -2109  2110 -316  2113 0

c  -1+1 --> 0
c    ( b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0 ∧  p_316) -> (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧ -b^{1, 317}_0)
c  in CNF:
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_2
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_1
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_0
c  in DIMACS:
-2108  2109 -2110 -316 -2111 0
-2108  2109 -2110 -316 -2112 0
-2108  2109 -2110 -316 -2113 0

c  0+1 --> 1
c    (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧  p_316) -> (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0)
c  in CNF:
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_2
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_1
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨  b^{1, 317}_0
c  in DIMACS:
 2108  2109  2110 -316 -2111 0
 2108  2109  2110 -316 -2112 0
 2108  2109  2110 -316  2113 0

c  1+1 --> 2
c    (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0 ∧  p_316) -> (-b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0)
c  in CNF:
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_2
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨  b^{1, 317}_1
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ -p_316 ∨ -b^{1, 317}_0
c  in DIMACS:
 2108  2109 -2110 -316 -2111 0
 2108  2109 -2110 -316  2112 0
 2108  2109 -2110 -316 -2113 0

c  2+1 --> break 
c    (-b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧  p_316) -> break
c  in CNF:
c     b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 2108 -2109  2110 -316 1162 0


c  2-1 --> 1
c    (-b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧ -p_316) -> (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0)
c  in CNF:
c     b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_2
c     b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_1
c     b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨  b^{1, 317}_0
c  in DIMACS:
 2108 -2109  2110  316 -2111 0
 2108 -2109  2110  316 -2112 0
 2108 -2109  2110  316  2113 0

c  1-1 --> 0
c    (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0 ∧ -p_316) -> (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧ -b^{1, 317}_0)
c  in CNF:
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_2
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_1
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_0
c  in DIMACS:
 2108  2109 -2110  316 -2111 0
 2108  2109 -2110  316 -2112 0
 2108  2109 -2110  316 -2113 0

c  0-1 --> -1
c    (-b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧ -p_316) -> ( b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0)
c  in CNF:
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨  b^{1, 317}_2
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_1
c     b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨  b^{1, 317}_0
c  in DIMACS:
 2108  2109  2110  316  2111 0
 2108  2109  2110  316 -2112 0
 2108  2109  2110  316  2113 0

c  -1-1 --> -2
c    ( b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧  b^{1, 316}_0 ∧ -p_316) -> ( b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0)
c  in CNF:
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨  b^{1, 317}_2
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨  b^{1, 317}_1
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨  p_316 ∨ -b^{1, 317}_0
c  in DIMACS:
-2108  2109 -2110  316  2111 0
-2108  2109 -2110  316  2112 0
-2108  2109 -2110  316 -2113 0

c  -2-1 --> break 
c    ( b^{1, 316}_2 ∧  b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨  b^{1, 316}_0 ∨  p_316 ∨ break
c  in DIMACS:
-2108 -2109  2110  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 316}_2 ∧ -b^{1, 316}_1 ∧ -b^{1, 316}_0 ∧ true) 
c  in CNF:
c    -b^{1, 316}_2 ∨  b^{1, 316}_1 ∨  b^{1, 316}_0 ∨ false 
c  in DIMACS:
-2108  2109  2110  0

c  3 does not represent an automaton state.
c    -(-b^{1, 316}_2 ∧  b^{1, 316}_1 ∧  b^{1, 316}_0 ∧ true) 
c  in CNF:
c     b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ false 
c  in DIMACS:
 2108 -2109 -2110  0
c  -3 does not represent an automaton state.
c    -( b^{1, 316}_2 ∧  b^{1, 316}_1 ∧  b^{1, 316}_0 ∧ true) 
c  in CNF:
c    -b^{1, 316}_2 ∨ -b^{1, 316}_1 ∨ -b^{1, 316}_0 ∨ false 
c  in DIMACS:
-2108 -2109 -2110  0

c i = 317
c  -2+1 --> -1
c    ( b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧  p_317) -> ( b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0)
c  in CNF:
c    -b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨  b^{1, 318}_2
c    -b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_1
c    -b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨  b^{1, 318}_0
c  in DIMACS:
-2111 -2112  2113 -317  2114 0
-2111 -2112  2113 -317 -2115 0
-2111 -2112  2113 -317  2116 0

c  -1+1 --> 0
c    ( b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0 ∧  p_317) -> (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧ -b^{1, 318}_0)
c  in CNF:
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_2
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_1
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_0
c  in DIMACS:
-2111  2112 -2113 -317 -2114 0
-2111  2112 -2113 -317 -2115 0
-2111  2112 -2113 -317 -2116 0

c  0+1 --> 1
c    (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧  p_317) -> (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0)
c  in CNF:
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_2
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_1
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨  b^{1, 318}_0
c  in DIMACS:
 2111  2112  2113 -317 -2114 0
 2111  2112  2113 -317 -2115 0
 2111  2112  2113 -317  2116 0

c  1+1 --> 2
c    (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0 ∧  p_317) -> (-b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0)
c  in CNF:
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_2
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨  b^{1, 318}_1
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ -p_317 ∨ -b^{1, 318}_0
c  in DIMACS:
 2111  2112 -2113 -317 -2114 0
 2111  2112 -2113 -317  2115 0
 2111  2112 -2113 -317 -2116 0

c  2+1 --> break 
c    (-b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧  p_317) -> break
c  in CNF:
c     b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ -p_317 ∨ break
c  in DIMACS:
 2111 -2112  2113 -317 1162 0


c  2-1 --> 1
c    (-b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧ -p_317) -> (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0)
c  in CNF:
c     b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_2
c     b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_1
c     b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨  b^{1, 318}_0
c  in DIMACS:
 2111 -2112  2113  317 -2114 0
 2111 -2112  2113  317 -2115 0
 2111 -2112  2113  317  2116 0

c  1-1 --> 0
c    (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0 ∧ -p_317) -> (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧ -b^{1, 318}_0)
c  in CNF:
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_2
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_1
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_0
c  in DIMACS:
 2111  2112 -2113  317 -2114 0
 2111  2112 -2113  317 -2115 0
 2111  2112 -2113  317 -2116 0

c  0-1 --> -1
c    (-b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧ -p_317) -> ( b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0)
c  in CNF:
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨  b^{1, 318}_2
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_1
c     b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨  b^{1, 318}_0
c  in DIMACS:
 2111  2112  2113  317  2114 0
 2111  2112  2113  317 -2115 0
 2111  2112  2113  317  2116 0

c  -1-1 --> -2
c    ( b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧  b^{1, 317}_0 ∧ -p_317) -> ( b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0)
c  in CNF:
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨  b^{1, 318}_2
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨  b^{1, 318}_1
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨  p_317 ∨ -b^{1, 318}_0
c  in DIMACS:
-2111  2112 -2113  317  2114 0
-2111  2112 -2113  317  2115 0
-2111  2112 -2113  317 -2116 0

c  -2-1 --> break 
c    ( b^{1, 317}_2 ∧  b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧ -p_317) -> break
c  in CNF:
c    -b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨  b^{1, 317}_0 ∨  p_317 ∨ break
c  in DIMACS:
-2111 -2112  2113  317 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 317}_2 ∧ -b^{1, 317}_1 ∧ -b^{1, 317}_0 ∧ true) 
c  in CNF:
c    -b^{1, 317}_2 ∨  b^{1, 317}_1 ∨  b^{1, 317}_0 ∨ false 
c  in DIMACS:
-2111  2112  2113  0

c  3 does not represent an automaton state.
c    -(-b^{1, 317}_2 ∧  b^{1, 317}_1 ∧  b^{1, 317}_0 ∧ true) 
c  in CNF:
c     b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ false 
c  in DIMACS:
 2111 -2112 -2113  0
c  -3 does not represent an automaton state.
c    -( b^{1, 317}_2 ∧  b^{1, 317}_1 ∧  b^{1, 317}_0 ∧ true) 
c  in CNF:
c    -b^{1, 317}_2 ∨ -b^{1, 317}_1 ∨ -b^{1, 317}_0 ∨ false 
c  in DIMACS:
-2111 -2112 -2113  0

c i = 318
c  -2+1 --> -1
c    ( b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧  p_318) -> ( b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0)
c  in CNF:
c    -b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨  b^{1, 319}_2
c    -b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_1
c    -b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨  b^{1, 319}_0
c  in DIMACS:
-2114 -2115  2116 -318  2117 0
-2114 -2115  2116 -318 -2118 0
-2114 -2115  2116 -318  2119 0

c  -1+1 --> 0
c    ( b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0 ∧  p_318) -> (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧ -b^{1, 319}_0)
c  in CNF:
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_2
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_1
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_0
c  in DIMACS:
-2114  2115 -2116 -318 -2117 0
-2114  2115 -2116 -318 -2118 0
-2114  2115 -2116 -318 -2119 0

c  0+1 --> 1
c    (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧  p_318) -> (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0)
c  in CNF:
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_2
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_1
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨  b^{1, 319}_0
c  in DIMACS:
 2114  2115  2116 -318 -2117 0
 2114  2115  2116 -318 -2118 0
 2114  2115  2116 -318  2119 0

c  1+1 --> 2
c    (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0 ∧  p_318) -> (-b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0)
c  in CNF:
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_2
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨  b^{1, 319}_1
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ -p_318 ∨ -b^{1, 319}_0
c  in DIMACS:
 2114  2115 -2116 -318 -2117 0
 2114  2115 -2116 -318  2118 0
 2114  2115 -2116 -318 -2119 0

c  2+1 --> break 
c    (-b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧  p_318) -> break
c  in CNF:
c     b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 2114 -2115  2116 -318 1162 0


c  2-1 --> 1
c    (-b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧ -p_318) -> (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0)
c  in CNF:
c     b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_2
c     b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_1
c     b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨  b^{1, 319}_0
c  in DIMACS:
 2114 -2115  2116  318 -2117 0
 2114 -2115  2116  318 -2118 0
 2114 -2115  2116  318  2119 0

c  1-1 --> 0
c    (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0 ∧ -p_318) -> (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧ -b^{1, 319}_0)
c  in CNF:
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_2
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_1
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_0
c  in DIMACS:
 2114  2115 -2116  318 -2117 0
 2114  2115 -2116  318 -2118 0
 2114  2115 -2116  318 -2119 0

c  0-1 --> -1
c    (-b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧ -p_318) -> ( b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0)
c  in CNF:
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨  b^{1, 319}_2
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_1
c     b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨  b^{1, 319}_0
c  in DIMACS:
 2114  2115  2116  318  2117 0
 2114  2115  2116  318 -2118 0
 2114  2115  2116  318  2119 0

c  -1-1 --> -2
c    ( b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧  b^{1, 318}_0 ∧ -p_318) -> ( b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0)
c  in CNF:
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨  b^{1, 319}_2
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨  b^{1, 319}_1
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨  p_318 ∨ -b^{1, 319}_0
c  in DIMACS:
-2114  2115 -2116  318  2117 0
-2114  2115 -2116  318  2118 0
-2114  2115 -2116  318 -2119 0

c  -2-1 --> break 
c    ( b^{1, 318}_2 ∧  b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨  b^{1, 318}_0 ∨  p_318 ∨ break
c  in DIMACS:
-2114 -2115  2116  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 318}_2 ∧ -b^{1, 318}_1 ∧ -b^{1, 318}_0 ∧ true) 
c  in CNF:
c    -b^{1, 318}_2 ∨  b^{1, 318}_1 ∨  b^{1, 318}_0 ∨ false 
c  in DIMACS:
-2114  2115  2116  0

c  3 does not represent an automaton state.
c    -(-b^{1, 318}_2 ∧  b^{1, 318}_1 ∧  b^{1, 318}_0 ∧ true) 
c  in CNF:
c     b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ false 
c  in DIMACS:
 2114 -2115 -2116  0
c  -3 does not represent an automaton state.
c    -( b^{1, 318}_2 ∧  b^{1, 318}_1 ∧  b^{1, 318}_0 ∧ true) 
c  in CNF:
c    -b^{1, 318}_2 ∨ -b^{1, 318}_1 ∨ -b^{1, 318}_0 ∨ false 
c  in DIMACS:
-2114 -2115 -2116  0

c i = 319
c  -2+1 --> -1
c    ( b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧  p_319) -> ( b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0)
c  in CNF:
c    -b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨  b^{1, 320}_2
c    -b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_1
c    -b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨  b^{1, 320}_0
c  in DIMACS:
-2117 -2118  2119 -319  2120 0
-2117 -2118  2119 -319 -2121 0
-2117 -2118  2119 -319  2122 0

c  -1+1 --> 0
c    ( b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0 ∧  p_319) -> (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧ -b^{1, 320}_0)
c  in CNF:
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_2
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_1
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_0
c  in DIMACS:
-2117  2118 -2119 -319 -2120 0
-2117  2118 -2119 -319 -2121 0
-2117  2118 -2119 -319 -2122 0

c  0+1 --> 1
c    (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧  p_319) -> (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0)
c  in CNF:
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_2
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_1
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨  b^{1, 320}_0
c  in DIMACS:
 2117  2118  2119 -319 -2120 0
 2117  2118  2119 -319 -2121 0
 2117  2118  2119 -319  2122 0

c  1+1 --> 2
c    (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0 ∧  p_319) -> (-b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0)
c  in CNF:
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_2
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨  b^{1, 320}_1
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ -p_319 ∨ -b^{1, 320}_0
c  in DIMACS:
 2117  2118 -2119 -319 -2120 0
 2117  2118 -2119 -319  2121 0
 2117  2118 -2119 -319 -2122 0

c  2+1 --> break 
c    (-b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧  p_319) -> break
c  in CNF:
c     b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ -p_319 ∨ break
c  in DIMACS:
 2117 -2118  2119 -319 1162 0


c  2-1 --> 1
c    (-b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧ -p_319) -> (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0)
c  in CNF:
c     b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_2
c     b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_1
c     b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨  b^{1, 320}_0
c  in DIMACS:
 2117 -2118  2119  319 -2120 0
 2117 -2118  2119  319 -2121 0
 2117 -2118  2119  319  2122 0

c  1-1 --> 0
c    (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0 ∧ -p_319) -> (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧ -b^{1, 320}_0)
c  in CNF:
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_2
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_1
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_0
c  in DIMACS:
 2117  2118 -2119  319 -2120 0
 2117  2118 -2119  319 -2121 0
 2117  2118 -2119  319 -2122 0

c  0-1 --> -1
c    (-b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧ -p_319) -> ( b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0)
c  in CNF:
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨  b^{1, 320}_2
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_1
c     b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨  b^{1, 320}_0
c  in DIMACS:
 2117  2118  2119  319  2120 0
 2117  2118  2119  319 -2121 0
 2117  2118  2119  319  2122 0

c  -1-1 --> -2
c    ( b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧  b^{1, 319}_0 ∧ -p_319) -> ( b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0)
c  in CNF:
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨  b^{1, 320}_2
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨  b^{1, 320}_1
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨  p_319 ∨ -b^{1, 320}_0
c  in DIMACS:
-2117  2118 -2119  319  2120 0
-2117  2118 -2119  319  2121 0
-2117  2118 -2119  319 -2122 0

c  -2-1 --> break 
c    ( b^{1, 319}_2 ∧  b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧ -p_319) -> break
c  in CNF:
c    -b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨  b^{1, 319}_0 ∨  p_319 ∨ break
c  in DIMACS:
-2117 -2118  2119  319 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 319}_2 ∧ -b^{1, 319}_1 ∧ -b^{1, 319}_0 ∧ true) 
c  in CNF:
c    -b^{1, 319}_2 ∨  b^{1, 319}_1 ∨  b^{1, 319}_0 ∨ false 
c  in DIMACS:
-2117  2118  2119  0

c  3 does not represent an automaton state.
c    -(-b^{1, 319}_2 ∧  b^{1, 319}_1 ∧  b^{1, 319}_0 ∧ true) 
c  in CNF:
c     b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ false 
c  in DIMACS:
 2117 -2118 -2119  0
c  -3 does not represent an automaton state.
c    -( b^{1, 319}_2 ∧  b^{1, 319}_1 ∧  b^{1, 319}_0 ∧ true) 
c  in CNF:
c    -b^{1, 319}_2 ∨ -b^{1, 319}_1 ∨ -b^{1, 319}_0 ∨ false 
c  in DIMACS:
-2117 -2118 -2119  0

c i = 320
c  -2+1 --> -1
c    ( b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧  p_320) -> ( b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0)
c  in CNF:
c    -b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨  b^{1, 321}_2
c    -b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_1
c    -b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨  b^{1, 321}_0
c  in DIMACS:
-2120 -2121  2122 -320  2123 0
-2120 -2121  2122 -320 -2124 0
-2120 -2121  2122 -320  2125 0

c  -1+1 --> 0
c    ( b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0 ∧  p_320) -> (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧ -b^{1, 321}_0)
c  in CNF:
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_2
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_1
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_0
c  in DIMACS:
-2120  2121 -2122 -320 -2123 0
-2120  2121 -2122 -320 -2124 0
-2120  2121 -2122 -320 -2125 0

c  0+1 --> 1
c    (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧  p_320) -> (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0)
c  in CNF:
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_2
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_1
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨  b^{1, 321}_0
c  in DIMACS:
 2120  2121  2122 -320 -2123 0
 2120  2121  2122 -320 -2124 0
 2120  2121  2122 -320  2125 0

c  1+1 --> 2
c    (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0 ∧  p_320) -> (-b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0)
c  in CNF:
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_2
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨  b^{1, 321}_1
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ -p_320 ∨ -b^{1, 321}_0
c  in DIMACS:
 2120  2121 -2122 -320 -2123 0
 2120  2121 -2122 -320  2124 0
 2120  2121 -2122 -320 -2125 0

c  2+1 --> break 
c    (-b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧  p_320) -> break
c  in CNF:
c     b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 2120 -2121  2122 -320 1162 0


c  2-1 --> 1
c    (-b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧ -p_320) -> (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0)
c  in CNF:
c     b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_2
c     b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_1
c     b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨  b^{1, 321}_0
c  in DIMACS:
 2120 -2121  2122  320 -2123 0
 2120 -2121  2122  320 -2124 0
 2120 -2121  2122  320  2125 0

c  1-1 --> 0
c    (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0 ∧ -p_320) -> (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧ -b^{1, 321}_0)
c  in CNF:
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_2
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_1
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_0
c  in DIMACS:
 2120  2121 -2122  320 -2123 0
 2120  2121 -2122  320 -2124 0
 2120  2121 -2122  320 -2125 0

c  0-1 --> -1
c    (-b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧ -p_320) -> ( b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0)
c  in CNF:
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨  b^{1, 321}_2
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_1
c     b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨  b^{1, 321}_0
c  in DIMACS:
 2120  2121  2122  320  2123 0
 2120  2121  2122  320 -2124 0
 2120  2121  2122  320  2125 0

c  -1-1 --> -2
c    ( b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧  b^{1, 320}_0 ∧ -p_320) -> ( b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0)
c  in CNF:
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨  b^{1, 321}_2
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨  b^{1, 321}_1
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨  p_320 ∨ -b^{1, 321}_0
c  in DIMACS:
-2120  2121 -2122  320  2123 0
-2120  2121 -2122  320  2124 0
-2120  2121 -2122  320 -2125 0

c  -2-1 --> break 
c    ( b^{1, 320}_2 ∧  b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨  b^{1, 320}_0 ∨  p_320 ∨ break
c  in DIMACS:
-2120 -2121  2122  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 320}_2 ∧ -b^{1, 320}_1 ∧ -b^{1, 320}_0 ∧ true) 
c  in CNF:
c    -b^{1, 320}_2 ∨  b^{1, 320}_1 ∨  b^{1, 320}_0 ∨ false 
c  in DIMACS:
-2120  2121  2122  0

c  3 does not represent an automaton state.
c    -(-b^{1, 320}_2 ∧  b^{1, 320}_1 ∧  b^{1, 320}_0 ∧ true) 
c  in CNF:
c     b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ false 
c  in DIMACS:
 2120 -2121 -2122  0
c  -3 does not represent an automaton state.
c    -( b^{1, 320}_2 ∧  b^{1, 320}_1 ∧  b^{1, 320}_0 ∧ true) 
c  in CNF:
c    -b^{1, 320}_2 ∨ -b^{1, 320}_1 ∨ -b^{1, 320}_0 ∨ false 
c  in DIMACS:
-2120 -2121 -2122  0

c i = 321
c  -2+1 --> -1
c    ( b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧  p_321) -> ( b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0)
c  in CNF:
c    -b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨  b^{1, 322}_2
c    -b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_1
c    -b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨  b^{1, 322}_0
c  in DIMACS:
-2123 -2124  2125 -321  2126 0
-2123 -2124  2125 -321 -2127 0
-2123 -2124  2125 -321  2128 0

c  -1+1 --> 0
c    ( b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0 ∧  p_321) -> (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧ -b^{1, 322}_0)
c  in CNF:
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_2
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_1
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_0
c  in DIMACS:
-2123  2124 -2125 -321 -2126 0
-2123  2124 -2125 -321 -2127 0
-2123  2124 -2125 -321 -2128 0

c  0+1 --> 1
c    (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧  p_321) -> (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0)
c  in CNF:
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_2
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_1
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨  b^{1, 322}_0
c  in DIMACS:
 2123  2124  2125 -321 -2126 0
 2123  2124  2125 -321 -2127 0
 2123  2124  2125 -321  2128 0

c  1+1 --> 2
c    (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0 ∧  p_321) -> (-b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0)
c  in CNF:
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_2
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨  b^{1, 322}_1
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ -p_321 ∨ -b^{1, 322}_0
c  in DIMACS:
 2123  2124 -2125 -321 -2126 0
 2123  2124 -2125 -321  2127 0
 2123  2124 -2125 -321 -2128 0

c  2+1 --> break 
c    (-b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧  p_321) -> break
c  in CNF:
c     b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ -p_321 ∨ break
c  in DIMACS:
 2123 -2124  2125 -321 1162 0


c  2-1 --> 1
c    (-b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧ -p_321) -> (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0)
c  in CNF:
c     b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_2
c     b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_1
c     b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨  b^{1, 322}_0
c  in DIMACS:
 2123 -2124  2125  321 -2126 0
 2123 -2124  2125  321 -2127 0
 2123 -2124  2125  321  2128 0

c  1-1 --> 0
c    (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0 ∧ -p_321) -> (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧ -b^{1, 322}_0)
c  in CNF:
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_2
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_1
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_0
c  in DIMACS:
 2123  2124 -2125  321 -2126 0
 2123  2124 -2125  321 -2127 0
 2123  2124 -2125  321 -2128 0

c  0-1 --> -1
c    (-b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧ -p_321) -> ( b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0)
c  in CNF:
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨  b^{1, 322}_2
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_1
c     b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨  b^{1, 322}_0
c  in DIMACS:
 2123  2124  2125  321  2126 0
 2123  2124  2125  321 -2127 0
 2123  2124  2125  321  2128 0

c  -1-1 --> -2
c    ( b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧  b^{1, 321}_0 ∧ -p_321) -> ( b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0)
c  in CNF:
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨  b^{1, 322}_2
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨  b^{1, 322}_1
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨  p_321 ∨ -b^{1, 322}_0
c  in DIMACS:
-2123  2124 -2125  321  2126 0
-2123  2124 -2125  321  2127 0
-2123  2124 -2125  321 -2128 0

c  -2-1 --> break 
c    ( b^{1, 321}_2 ∧  b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧ -p_321) -> break
c  in CNF:
c    -b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨  b^{1, 321}_0 ∨  p_321 ∨ break
c  in DIMACS:
-2123 -2124  2125  321 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 321}_2 ∧ -b^{1, 321}_1 ∧ -b^{1, 321}_0 ∧ true) 
c  in CNF:
c    -b^{1, 321}_2 ∨  b^{1, 321}_1 ∨  b^{1, 321}_0 ∨ false 
c  in DIMACS:
-2123  2124  2125  0

c  3 does not represent an automaton state.
c    -(-b^{1, 321}_2 ∧  b^{1, 321}_1 ∧  b^{1, 321}_0 ∧ true) 
c  in CNF:
c     b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ false 
c  in DIMACS:
 2123 -2124 -2125  0
c  -3 does not represent an automaton state.
c    -( b^{1, 321}_2 ∧  b^{1, 321}_1 ∧  b^{1, 321}_0 ∧ true) 
c  in CNF:
c    -b^{1, 321}_2 ∨ -b^{1, 321}_1 ∨ -b^{1, 321}_0 ∨ false 
c  in DIMACS:
-2123 -2124 -2125  0

c i = 322
c  -2+1 --> -1
c    ( b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧  p_322) -> ( b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0)
c  in CNF:
c    -b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨  b^{1, 323}_2
c    -b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_1
c    -b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨  b^{1, 323}_0
c  in DIMACS:
-2126 -2127  2128 -322  2129 0
-2126 -2127  2128 -322 -2130 0
-2126 -2127  2128 -322  2131 0

c  -1+1 --> 0
c    ( b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0 ∧  p_322) -> (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧ -b^{1, 323}_0)
c  in CNF:
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_2
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_1
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_0
c  in DIMACS:
-2126  2127 -2128 -322 -2129 0
-2126  2127 -2128 -322 -2130 0
-2126  2127 -2128 -322 -2131 0

c  0+1 --> 1
c    (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧  p_322) -> (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0)
c  in CNF:
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_2
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_1
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨  b^{1, 323}_0
c  in DIMACS:
 2126  2127  2128 -322 -2129 0
 2126  2127  2128 -322 -2130 0
 2126  2127  2128 -322  2131 0

c  1+1 --> 2
c    (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0 ∧  p_322) -> (-b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0)
c  in CNF:
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_2
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨  b^{1, 323}_1
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ -p_322 ∨ -b^{1, 323}_0
c  in DIMACS:
 2126  2127 -2128 -322 -2129 0
 2126  2127 -2128 -322  2130 0
 2126  2127 -2128 -322 -2131 0

c  2+1 --> break 
c    (-b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧  p_322) -> break
c  in CNF:
c     b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 2126 -2127  2128 -322 1162 0


c  2-1 --> 1
c    (-b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧ -p_322) -> (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0)
c  in CNF:
c     b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_2
c     b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_1
c     b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨  b^{1, 323}_0
c  in DIMACS:
 2126 -2127  2128  322 -2129 0
 2126 -2127  2128  322 -2130 0
 2126 -2127  2128  322  2131 0

c  1-1 --> 0
c    (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0 ∧ -p_322) -> (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧ -b^{1, 323}_0)
c  in CNF:
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_2
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_1
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_0
c  in DIMACS:
 2126  2127 -2128  322 -2129 0
 2126  2127 -2128  322 -2130 0
 2126  2127 -2128  322 -2131 0

c  0-1 --> -1
c    (-b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧ -p_322) -> ( b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0)
c  in CNF:
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨  b^{1, 323}_2
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_1
c     b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨  b^{1, 323}_0
c  in DIMACS:
 2126  2127  2128  322  2129 0
 2126  2127  2128  322 -2130 0
 2126  2127  2128  322  2131 0

c  -1-1 --> -2
c    ( b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧  b^{1, 322}_0 ∧ -p_322) -> ( b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0)
c  in CNF:
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨  b^{1, 323}_2
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨  b^{1, 323}_1
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨  p_322 ∨ -b^{1, 323}_0
c  in DIMACS:
-2126  2127 -2128  322  2129 0
-2126  2127 -2128  322  2130 0
-2126  2127 -2128  322 -2131 0

c  -2-1 --> break 
c    ( b^{1, 322}_2 ∧  b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨  b^{1, 322}_0 ∨  p_322 ∨ break
c  in DIMACS:
-2126 -2127  2128  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 322}_2 ∧ -b^{1, 322}_1 ∧ -b^{1, 322}_0 ∧ true) 
c  in CNF:
c    -b^{1, 322}_2 ∨  b^{1, 322}_1 ∨  b^{1, 322}_0 ∨ false 
c  in DIMACS:
-2126  2127  2128  0

c  3 does not represent an automaton state.
c    -(-b^{1, 322}_2 ∧  b^{1, 322}_1 ∧  b^{1, 322}_0 ∧ true) 
c  in CNF:
c     b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ false 
c  in DIMACS:
 2126 -2127 -2128  0
c  -3 does not represent an automaton state.
c    -( b^{1, 322}_2 ∧  b^{1, 322}_1 ∧  b^{1, 322}_0 ∧ true) 
c  in CNF:
c    -b^{1, 322}_2 ∨ -b^{1, 322}_1 ∨ -b^{1, 322}_0 ∨ false 
c  in DIMACS:
-2126 -2127 -2128  0

c i = 323
c  -2+1 --> -1
c    ( b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧  p_323) -> ( b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0)
c  in CNF:
c    -b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨  b^{1, 324}_2
c    -b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_1
c    -b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨  b^{1, 324}_0
c  in DIMACS:
-2129 -2130  2131 -323  2132 0
-2129 -2130  2131 -323 -2133 0
-2129 -2130  2131 -323  2134 0

c  -1+1 --> 0
c    ( b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0 ∧  p_323) -> (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧ -b^{1, 324}_0)
c  in CNF:
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_2
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_1
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_0
c  in DIMACS:
-2129  2130 -2131 -323 -2132 0
-2129  2130 -2131 -323 -2133 0
-2129  2130 -2131 -323 -2134 0

c  0+1 --> 1
c    (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧  p_323) -> (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0)
c  in CNF:
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_2
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_1
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨  b^{1, 324}_0
c  in DIMACS:
 2129  2130  2131 -323 -2132 0
 2129  2130  2131 -323 -2133 0
 2129  2130  2131 -323  2134 0

c  1+1 --> 2
c    (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0 ∧  p_323) -> (-b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0)
c  in CNF:
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_2
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨  b^{1, 324}_1
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ -p_323 ∨ -b^{1, 324}_0
c  in DIMACS:
 2129  2130 -2131 -323 -2132 0
 2129  2130 -2131 -323  2133 0
 2129  2130 -2131 -323 -2134 0

c  2+1 --> break 
c    (-b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧  p_323) -> break
c  in CNF:
c     b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ -p_323 ∨ break
c  in DIMACS:
 2129 -2130  2131 -323 1162 0


c  2-1 --> 1
c    (-b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧ -p_323) -> (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0)
c  in CNF:
c     b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_2
c     b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_1
c     b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨  b^{1, 324}_0
c  in DIMACS:
 2129 -2130  2131  323 -2132 0
 2129 -2130  2131  323 -2133 0
 2129 -2130  2131  323  2134 0

c  1-1 --> 0
c    (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0 ∧ -p_323) -> (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧ -b^{1, 324}_0)
c  in CNF:
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_2
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_1
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_0
c  in DIMACS:
 2129  2130 -2131  323 -2132 0
 2129  2130 -2131  323 -2133 0
 2129  2130 -2131  323 -2134 0

c  0-1 --> -1
c    (-b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧ -p_323) -> ( b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0)
c  in CNF:
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨  b^{1, 324}_2
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_1
c     b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨  b^{1, 324}_0
c  in DIMACS:
 2129  2130  2131  323  2132 0
 2129  2130  2131  323 -2133 0
 2129  2130  2131  323  2134 0

c  -1-1 --> -2
c    ( b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧  b^{1, 323}_0 ∧ -p_323) -> ( b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0)
c  in CNF:
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨  b^{1, 324}_2
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨  b^{1, 324}_1
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨  p_323 ∨ -b^{1, 324}_0
c  in DIMACS:
-2129  2130 -2131  323  2132 0
-2129  2130 -2131  323  2133 0
-2129  2130 -2131  323 -2134 0

c  -2-1 --> break 
c    ( b^{1, 323}_2 ∧  b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧ -p_323) -> break
c  in CNF:
c    -b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨  b^{1, 323}_0 ∨  p_323 ∨ break
c  in DIMACS:
-2129 -2130  2131  323 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 323}_2 ∧ -b^{1, 323}_1 ∧ -b^{1, 323}_0 ∧ true) 
c  in CNF:
c    -b^{1, 323}_2 ∨  b^{1, 323}_1 ∨  b^{1, 323}_0 ∨ false 
c  in DIMACS:
-2129  2130  2131  0

c  3 does not represent an automaton state.
c    -(-b^{1, 323}_2 ∧  b^{1, 323}_1 ∧  b^{1, 323}_0 ∧ true) 
c  in CNF:
c     b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ false 
c  in DIMACS:
 2129 -2130 -2131  0
c  -3 does not represent an automaton state.
c    -( b^{1, 323}_2 ∧  b^{1, 323}_1 ∧  b^{1, 323}_0 ∧ true) 
c  in CNF:
c    -b^{1, 323}_2 ∨ -b^{1, 323}_1 ∨ -b^{1, 323}_0 ∨ false 
c  in DIMACS:
-2129 -2130 -2131  0

c i = 324
c  -2+1 --> -1
c    ( b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧  p_324) -> ( b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0)
c  in CNF:
c    -b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨  b^{1, 325}_2
c    -b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_1
c    -b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨  b^{1, 325}_0
c  in DIMACS:
-2132 -2133  2134 -324  2135 0
-2132 -2133  2134 -324 -2136 0
-2132 -2133  2134 -324  2137 0

c  -1+1 --> 0
c    ( b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0 ∧  p_324) -> (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧ -b^{1, 325}_0)
c  in CNF:
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_2
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_1
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_0
c  in DIMACS:
-2132  2133 -2134 -324 -2135 0
-2132  2133 -2134 -324 -2136 0
-2132  2133 -2134 -324 -2137 0

c  0+1 --> 1
c    (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧  p_324) -> (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0)
c  in CNF:
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_2
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_1
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨  b^{1, 325}_0
c  in DIMACS:
 2132  2133  2134 -324 -2135 0
 2132  2133  2134 -324 -2136 0
 2132  2133  2134 -324  2137 0

c  1+1 --> 2
c    (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0 ∧  p_324) -> (-b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0)
c  in CNF:
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_2
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨  b^{1, 325}_1
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ -p_324 ∨ -b^{1, 325}_0
c  in DIMACS:
 2132  2133 -2134 -324 -2135 0
 2132  2133 -2134 -324  2136 0
 2132  2133 -2134 -324 -2137 0

c  2+1 --> break 
c    (-b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧  p_324) -> break
c  in CNF:
c     b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 2132 -2133  2134 -324 1162 0


c  2-1 --> 1
c    (-b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧ -p_324) -> (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0)
c  in CNF:
c     b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_2
c     b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_1
c     b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨  b^{1, 325}_0
c  in DIMACS:
 2132 -2133  2134  324 -2135 0
 2132 -2133  2134  324 -2136 0
 2132 -2133  2134  324  2137 0

c  1-1 --> 0
c    (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0 ∧ -p_324) -> (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧ -b^{1, 325}_0)
c  in CNF:
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_2
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_1
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_0
c  in DIMACS:
 2132  2133 -2134  324 -2135 0
 2132  2133 -2134  324 -2136 0
 2132  2133 -2134  324 -2137 0

c  0-1 --> -1
c    (-b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧ -p_324) -> ( b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0)
c  in CNF:
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨  b^{1, 325}_2
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_1
c     b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨  b^{1, 325}_0
c  in DIMACS:
 2132  2133  2134  324  2135 0
 2132  2133  2134  324 -2136 0
 2132  2133  2134  324  2137 0

c  -1-1 --> -2
c    ( b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧  b^{1, 324}_0 ∧ -p_324) -> ( b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0)
c  in CNF:
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨  b^{1, 325}_2
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨  b^{1, 325}_1
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨  p_324 ∨ -b^{1, 325}_0
c  in DIMACS:
-2132  2133 -2134  324  2135 0
-2132  2133 -2134  324  2136 0
-2132  2133 -2134  324 -2137 0

c  -2-1 --> break 
c    ( b^{1, 324}_2 ∧  b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨  b^{1, 324}_0 ∨  p_324 ∨ break
c  in DIMACS:
-2132 -2133  2134  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 324}_2 ∧ -b^{1, 324}_1 ∧ -b^{1, 324}_0 ∧ true) 
c  in CNF:
c    -b^{1, 324}_2 ∨  b^{1, 324}_1 ∨  b^{1, 324}_0 ∨ false 
c  in DIMACS:
-2132  2133  2134  0

c  3 does not represent an automaton state.
c    -(-b^{1, 324}_2 ∧  b^{1, 324}_1 ∧  b^{1, 324}_0 ∧ true) 
c  in CNF:
c     b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ false 
c  in DIMACS:
 2132 -2133 -2134  0
c  -3 does not represent an automaton state.
c    -( b^{1, 324}_2 ∧  b^{1, 324}_1 ∧  b^{1, 324}_0 ∧ true) 
c  in CNF:
c    -b^{1, 324}_2 ∨ -b^{1, 324}_1 ∨ -b^{1, 324}_0 ∨ false 
c  in DIMACS:
-2132 -2133 -2134  0

c i = 325
c  -2+1 --> -1
c    ( b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧  p_325) -> ( b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0)
c  in CNF:
c    -b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨  b^{1, 326}_2
c    -b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_1
c    -b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨  b^{1, 326}_0
c  in DIMACS:
-2135 -2136  2137 -325  2138 0
-2135 -2136  2137 -325 -2139 0
-2135 -2136  2137 -325  2140 0

c  -1+1 --> 0
c    ( b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0 ∧  p_325) -> (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧ -b^{1, 326}_0)
c  in CNF:
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_2
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_1
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_0
c  in DIMACS:
-2135  2136 -2137 -325 -2138 0
-2135  2136 -2137 -325 -2139 0
-2135  2136 -2137 -325 -2140 0

c  0+1 --> 1
c    (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧  p_325) -> (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0)
c  in CNF:
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_2
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_1
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨  b^{1, 326}_0
c  in DIMACS:
 2135  2136  2137 -325 -2138 0
 2135  2136  2137 -325 -2139 0
 2135  2136  2137 -325  2140 0

c  1+1 --> 2
c    (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0 ∧  p_325) -> (-b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0)
c  in CNF:
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_2
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨  b^{1, 326}_1
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ -p_325 ∨ -b^{1, 326}_0
c  in DIMACS:
 2135  2136 -2137 -325 -2138 0
 2135  2136 -2137 -325  2139 0
 2135  2136 -2137 -325 -2140 0

c  2+1 --> break 
c    (-b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧  p_325) -> break
c  in CNF:
c     b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 2135 -2136  2137 -325 1162 0


c  2-1 --> 1
c    (-b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧ -p_325) -> (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0)
c  in CNF:
c     b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_2
c     b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_1
c     b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨  b^{1, 326}_0
c  in DIMACS:
 2135 -2136  2137  325 -2138 0
 2135 -2136  2137  325 -2139 0
 2135 -2136  2137  325  2140 0

c  1-1 --> 0
c    (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0 ∧ -p_325) -> (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧ -b^{1, 326}_0)
c  in CNF:
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_2
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_1
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_0
c  in DIMACS:
 2135  2136 -2137  325 -2138 0
 2135  2136 -2137  325 -2139 0
 2135  2136 -2137  325 -2140 0

c  0-1 --> -1
c    (-b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧ -p_325) -> ( b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0)
c  in CNF:
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨  b^{1, 326}_2
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_1
c     b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨  b^{1, 326}_0
c  in DIMACS:
 2135  2136  2137  325  2138 0
 2135  2136  2137  325 -2139 0
 2135  2136  2137  325  2140 0

c  -1-1 --> -2
c    ( b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧  b^{1, 325}_0 ∧ -p_325) -> ( b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0)
c  in CNF:
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨  b^{1, 326}_2
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨  b^{1, 326}_1
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨  p_325 ∨ -b^{1, 326}_0
c  in DIMACS:
-2135  2136 -2137  325  2138 0
-2135  2136 -2137  325  2139 0
-2135  2136 -2137  325 -2140 0

c  -2-1 --> break 
c    ( b^{1, 325}_2 ∧  b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨  b^{1, 325}_0 ∨  p_325 ∨ break
c  in DIMACS:
-2135 -2136  2137  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 325}_2 ∧ -b^{1, 325}_1 ∧ -b^{1, 325}_0 ∧ true) 
c  in CNF:
c    -b^{1, 325}_2 ∨  b^{1, 325}_1 ∨  b^{1, 325}_0 ∨ false 
c  in DIMACS:
-2135  2136  2137  0

c  3 does not represent an automaton state.
c    -(-b^{1, 325}_2 ∧  b^{1, 325}_1 ∧  b^{1, 325}_0 ∧ true) 
c  in CNF:
c     b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ false 
c  in DIMACS:
 2135 -2136 -2137  0
c  -3 does not represent an automaton state.
c    -( b^{1, 325}_2 ∧  b^{1, 325}_1 ∧  b^{1, 325}_0 ∧ true) 
c  in CNF:
c    -b^{1, 325}_2 ∨ -b^{1, 325}_1 ∨ -b^{1, 325}_0 ∨ false 
c  in DIMACS:
-2135 -2136 -2137  0

c i = 326
c  -2+1 --> -1
c    ( b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧  p_326) -> ( b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0)
c  in CNF:
c    -b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨  b^{1, 327}_2
c    -b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_1
c    -b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨  b^{1, 327}_0
c  in DIMACS:
-2138 -2139  2140 -326  2141 0
-2138 -2139  2140 -326 -2142 0
-2138 -2139  2140 -326  2143 0

c  -1+1 --> 0
c    ( b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0 ∧  p_326) -> (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧ -b^{1, 327}_0)
c  in CNF:
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_2
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_1
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_0
c  in DIMACS:
-2138  2139 -2140 -326 -2141 0
-2138  2139 -2140 -326 -2142 0
-2138  2139 -2140 -326 -2143 0

c  0+1 --> 1
c    (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧  p_326) -> (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0)
c  in CNF:
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_2
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_1
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨  b^{1, 327}_0
c  in DIMACS:
 2138  2139  2140 -326 -2141 0
 2138  2139  2140 -326 -2142 0
 2138  2139  2140 -326  2143 0

c  1+1 --> 2
c    (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0 ∧  p_326) -> (-b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0)
c  in CNF:
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_2
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨  b^{1, 327}_1
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ -p_326 ∨ -b^{1, 327}_0
c  in DIMACS:
 2138  2139 -2140 -326 -2141 0
 2138  2139 -2140 -326  2142 0
 2138  2139 -2140 -326 -2143 0

c  2+1 --> break 
c    (-b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧  p_326) -> break
c  in CNF:
c     b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ -p_326 ∨ break
c  in DIMACS:
 2138 -2139  2140 -326 1162 0


c  2-1 --> 1
c    (-b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧ -p_326) -> (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0)
c  in CNF:
c     b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_2
c     b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_1
c     b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨  b^{1, 327}_0
c  in DIMACS:
 2138 -2139  2140  326 -2141 0
 2138 -2139  2140  326 -2142 0
 2138 -2139  2140  326  2143 0

c  1-1 --> 0
c    (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0 ∧ -p_326) -> (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧ -b^{1, 327}_0)
c  in CNF:
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_2
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_1
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_0
c  in DIMACS:
 2138  2139 -2140  326 -2141 0
 2138  2139 -2140  326 -2142 0
 2138  2139 -2140  326 -2143 0

c  0-1 --> -1
c    (-b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧ -p_326) -> ( b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0)
c  in CNF:
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨  b^{1, 327}_2
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_1
c     b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨  b^{1, 327}_0
c  in DIMACS:
 2138  2139  2140  326  2141 0
 2138  2139  2140  326 -2142 0
 2138  2139  2140  326  2143 0

c  -1-1 --> -2
c    ( b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧  b^{1, 326}_0 ∧ -p_326) -> ( b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0)
c  in CNF:
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨  b^{1, 327}_2
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨  b^{1, 327}_1
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨  p_326 ∨ -b^{1, 327}_0
c  in DIMACS:
-2138  2139 -2140  326  2141 0
-2138  2139 -2140  326  2142 0
-2138  2139 -2140  326 -2143 0

c  -2-1 --> break 
c    ( b^{1, 326}_2 ∧  b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧ -p_326) -> break
c  in CNF:
c    -b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨  b^{1, 326}_0 ∨  p_326 ∨ break
c  in DIMACS:
-2138 -2139  2140  326 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 326}_2 ∧ -b^{1, 326}_1 ∧ -b^{1, 326}_0 ∧ true) 
c  in CNF:
c    -b^{1, 326}_2 ∨  b^{1, 326}_1 ∨  b^{1, 326}_0 ∨ false 
c  in DIMACS:
-2138  2139  2140  0

c  3 does not represent an automaton state.
c    -(-b^{1, 326}_2 ∧  b^{1, 326}_1 ∧  b^{1, 326}_0 ∧ true) 
c  in CNF:
c     b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ false 
c  in DIMACS:
 2138 -2139 -2140  0
c  -3 does not represent an automaton state.
c    -( b^{1, 326}_2 ∧  b^{1, 326}_1 ∧  b^{1, 326}_0 ∧ true) 
c  in CNF:
c    -b^{1, 326}_2 ∨ -b^{1, 326}_1 ∨ -b^{1, 326}_0 ∨ false 
c  in DIMACS:
-2138 -2139 -2140  0

c i = 327
c  -2+1 --> -1
c    ( b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧  p_327) -> ( b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0)
c  in CNF:
c    -b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨  b^{1, 328}_2
c    -b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_1
c    -b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨  b^{1, 328}_0
c  in DIMACS:
-2141 -2142  2143 -327  2144 0
-2141 -2142  2143 -327 -2145 0
-2141 -2142  2143 -327  2146 0

c  -1+1 --> 0
c    ( b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0 ∧  p_327) -> (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧ -b^{1, 328}_0)
c  in CNF:
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_2
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_1
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_0
c  in DIMACS:
-2141  2142 -2143 -327 -2144 0
-2141  2142 -2143 -327 -2145 0
-2141  2142 -2143 -327 -2146 0

c  0+1 --> 1
c    (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧  p_327) -> (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0)
c  in CNF:
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_2
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_1
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨  b^{1, 328}_0
c  in DIMACS:
 2141  2142  2143 -327 -2144 0
 2141  2142  2143 -327 -2145 0
 2141  2142  2143 -327  2146 0

c  1+1 --> 2
c    (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0 ∧  p_327) -> (-b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0)
c  in CNF:
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_2
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨  b^{1, 328}_1
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ -p_327 ∨ -b^{1, 328}_0
c  in DIMACS:
 2141  2142 -2143 -327 -2144 0
 2141  2142 -2143 -327  2145 0
 2141  2142 -2143 -327 -2146 0

c  2+1 --> break 
c    (-b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧  p_327) -> break
c  in CNF:
c     b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ -p_327 ∨ break
c  in DIMACS:
 2141 -2142  2143 -327 1162 0


c  2-1 --> 1
c    (-b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧ -p_327) -> (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0)
c  in CNF:
c     b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_2
c     b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_1
c     b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨  b^{1, 328}_0
c  in DIMACS:
 2141 -2142  2143  327 -2144 0
 2141 -2142  2143  327 -2145 0
 2141 -2142  2143  327  2146 0

c  1-1 --> 0
c    (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0 ∧ -p_327) -> (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧ -b^{1, 328}_0)
c  in CNF:
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_2
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_1
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_0
c  in DIMACS:
 2141  2142 -2143  327 -2144 0
 2141  2142 -2143  327 -2145 0
 2141  2142 -2143  327 -2146 0

c  0-1 --> -1
c    (-b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧ -p_327) -> ( b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0)
c  in CNF:
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨  b^{1, 328}_2
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_1
c     b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨  b^{1, 328}_0
c  in DIMACS:
 2141  2142  2143  327  2144 0
 2141  2142  2143  327 -2145 0
 2141  2142  2143  327  2146 0

c  -1-1 --> -2
c    ( b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧  b^{1, 327}_0 ∧ -p_327) -> ( b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0)
c  in CNF:
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨  b^{1, 328}_2
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨  b^{1, 328}_1
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨  p_327 ∨ -b^{1, 328}_0
c  in DIMACS:
-2141  2142 -2143  327  2144 0
-2141  2142 -2143  327  2145 0
-2141  2142 -2143  327 -2146 0

c  -2-1 --> break 
c    ( b^{1, 327}_2 ∧  b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧ -p_327) -> break
c  in CNF:
c    -b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨  b^{1, 327}_0 ∨  p_327 ∨ break
c  in DIMACS:
-2141 -2142  2143  327 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 327}_2 ∧ -b^{1, 327}_1 ∧ -b^{1, 327}_0 ∧ true) 
c  in CNF:
c    -b^{1, 327}_2 ∨  b^{1, 327}_1 ∨  b^{1, 327}_0 ∨ false 
c  in DIMACS:
-2141  2142  2143  0

c  3 does not represent an automaton state.
c    -(-b^{1, 327}_2 ∧  b^{1, 327}_1 ∧  b^{1, 327}_0 ∧ true) 
c  in CNF:
c     b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ false 
c  in DIMACS:
 2141 -2142 -2143  0
c  -3 does not represent an automaton state.
c    -( b^{1, 327}_2 ∧  b^{1, 327}_1 ∧  b^{1, 327}_0 ∧ true) 
c  in CNF:
c    -b^{1, 327}_2 ∨ -b^{1, 327}_1 ∨ -b^{1, 327}_0 ∨ false 
c  in DIMACS:
-2141 -2142 -2143  0

c i = 328
c  -2+1 --> -1
c    ( b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧  p_328) -> ( b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0)
c  in CNF:
c    -b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨  b^{1, 329}_2
c    -b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_1
c    -b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨  b^{1, 329}_0
c  in DIMACS:
-2144 -2145  2146 -328  2147 0
-2144 -2145  2146 -328 -2148 0
-2144 -2145  2146 -328  2149 0

c  -1+1 --> 0
c    ( b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0 ∧  p_328) -> (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧ -b^{1, 329}_0)
c  in CNF:
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_2
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_1
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_0
c  in DIMACS:
-2144  2145 -2146 -328 -2147 0
-2144  2145 -2146 -328 -2148 0
-2144  2145 -2146 -328 -2149 0

c  0+1 --> 1
c    (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧  p_328) -> (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0)
c  in CNF:
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_2
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_1
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨  b^{1, 329}_0
c  in DIMACS:
 2144  2145  2146 -328 -2147 0
 2144  2145  2146 -328 -2148 0
 2144  2145  2146 -328  2149 0

c  1+1 --> 2
c    (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0 ∧  p_328) -> (-b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0)
c  in CNF:
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_2
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨  b^{1, 329}_1
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ -p_328 ∨ -b^{1, 329}_0
c  in DIMACS:
 2144  2145 -2146 -328 -2147 0
 2144  2145 -2146 -328  2148 0
 2144  2145 -2146 -328 -2149 0

c  2+1 --> break 
c    (-b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧  p_328) -> break
c  in CNF:
c     b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 2144 -2145  2146 -328 1162 0


c  2-1 --> 1
c    (-b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧ -p_328) -> (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0)
c  in CNF:
c     b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_2
c     b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_1
c     b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨  b^{1, 329}_0
c  in DIMACS:
 2144 -2145  2146  328 -2147 0
 2144 -2145  2146  328 -2148 0
 2144 -2145  2146  328  2149 0

c  1-1 --> 0
c    (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0 ∧ -p_328) -> (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧ -b^{1, 329}_0)
c  in CNF:
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_2
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_1
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_0
c  in DIMACS:
 2144  2145 -2146  328 -2147 0
 2144  2145 -2146  328 -2148 0
 2144  2145 -2146  328 -2149 0

c  0-1 --> -1
c    (-b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧ -p_328) -> ( b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0)
c  in CNF:
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨  b^{1, 329}_2
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_1
c     b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨  b^{1, 329}_0
c  in DIMACS:
 2144  2145  2146  328  2147 0
 2144  2145  2146  328 -2148 0
 2144  2145  2146  328  2149 0

c  -1-1 --> -2
c    ( b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧  b^{1, 328}_0 ∧ -p_328) -> ( b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0)
c  in CNF:
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨  b^{1, 329}_2
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨  b^{1, 329}_1
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨  p_328 ∨ -b^{1, 329}_0
c  in DIMACS:
-2144  2145 -2146  328  2147 0
-2144  2145 -2146  328  2148 0
-2144  2145 -2146  328 -2149 0

c  -2-1 --> break 
c    ( b^{1, 328}_2 ∧  b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨  b^{1, 328}_0 ∨  p_328 ∨ break
c  in DIMACS:
-2144 -2145  2146  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 328}_2 ∧ -b^{1, 328}_1 ∧ -b^{1, 328}_0 ∧ true) 
c  in CNF:
c    -b^{1, 328}_2 ∨  b^{1, 328}_1 ∨  b^{1, 328}_0 ∨ false 
c  in DIMACS:
-2144  2145  2146  0

c  3 does not represent an automaton state.
c    -(-b^{1, 328}_2 ∧  b^{1, 328}_1 ∧  b^{1, 328}_0 ∧ true) 
c  in CNF:
c     b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ false 
c  in DIMACS:
 2144 -2145 -2146  0
c  -3 does not represent an automaton state.
c    -( b^{1, 328}_2 ∧  b^{1, 328}_1 ∧  b^{1, 328}_0 ∧ true) 
c  in CNF:
c    -b^{1, 328}_2 ∨ -b^{1, 328}_1 ∨ -b^{1, 328}_0 ∨ false 
c  in DIMACS:
-2144 -2145 -2146  0

c i = 329
c  -2+1 --> -1
c    ( b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧  p_329) -> ( b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0)
c  in CNF:
c    -b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨  b^{1, 330}_2
c    -b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_1
c    -b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨  b^{1, 330}_0
c  in DIMACS:
-2147 -2148  2149 -329  2150 0
-2147 -2148  2149 -329 -2151 0
-2147 -2148  2149 -329  2152 0

c  -1+1 --> 0
c    ( b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0 ∧  p_329) -> (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧ -b^{1, 330}_0)
c  in CNF:
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_2
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_1
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_0
c  in DIMACS:
-2147  2148 -2149 -329 -2150 0
-2147  2148 -2149 -329 -2151 0
-2147  2148 -2149 -329 -2152 0

c  0+1 --> 1
c    (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧  p_329) -> (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0)
c  in CNF:
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_2
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_1
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨  b^{1, 330}_0
c  in DIMACS:
 2147  2148  2149 -329 -2150 0
 2147  2148  2149 -329 -2151 0
 2147  2148  2149 -329  2152 0

c  1+1 --> 2
c    (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0 ∧  p_329) -> (-b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0)
c  in CNF:
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_2
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨  b^{1, 330}_1
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ -p_329 ∨ -b^{1, 330}_0
c  in DIMACS:
 2147  2148 -2149 -329 -2150 0
 2147  2148 -2149 -329  2151 0
 2147  2148 -2149 -329 -2152 0

c  2+1 --> break 
c    (-b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧  p_329) -> break
c  in CNF:
c     b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ -p_329 ∨ break
c  in DIMACS:
 2147 -2148  2149 -329 1162 0


c  2-1 --> 1
c    (-b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧ -p_329) -> (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0)
c  in CNF:
c     b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_2
c     b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_1
c     b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨  b^{1, 330}_0
c  in DIMACS:
 2147 -2148  2149  329 -2150 0
 2147 -2148  2149  329 -2151 0
 2147 -2148  2149  329  2152 0

c  1-1 --> 0
c    (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0 ∧ -p_329) -> (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧ -b^{1, 330}_0)
c  in CNF:
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_2
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_1
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_0
c  in DIMACS:
 2147  2148 -2149  329 -2150 0
 2147  2148 -2149  329 -2151 0
 2147  2148 -2149  329 -2152 0

c  0-1 --> -1
c    (-b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧ -p_329) -> ( b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0)
c  in CNF:
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨  b^{1, 330}_2
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_1
c     b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨  b^{1, 330}_0
c  in DIMACS:
 2147  2148  2149  329  2150 0
 2147  2148  2149  329 -2151 0
 2147  2148  2149  329  2152 0

c  -1-1 --> -2
c    ( b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧  b^{1, 329}_0 ∧ -p_329) -> ( b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0)
c  in CNF:
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨  b^{1, 330}_2
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨  b^{1, 330}_1
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨  p_329 ∨ -b^{1, 330}_0
c  in DIMACS:
-2147  2148 -2149  329  2150 0
-2147  2148 -2149  329  2151 0
-2147  2148 -2149  329 -2152 0

c  -2-1 --> break 
c    ( b^{1, 329}_2 ∧  b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧ -p_329) -> break
c  in CNF:
c    -b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨  b^{1, 329}_0 ∨  p_329 ∨ break
c  in DIMACS:
-2147 -2148  2149  329 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 329}_2 ∧ -b^{1, 329}_1 ∧ -b^{1, 329}_0 ∧ true) 
c  in CNF:
c    -b^{1, 329}_2 ∨  b^{1, 329}_1 ∨  b^{1, 329}_0 ∨ false 
c  in DIMACS:
-2147  2148  2149  0

c  3 does not represent an automaton state.
c    -(-b^{1, 329}_2 ∧  b^{1, 329}_1 ∧  b^{1, 329}_0 ∧ true) 
c  in CNF:
c     b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ false 
c  in DIMACS:
 2147 -2148 -2149  0
c  -3 does not represent an automaton state.
c    -( b^{1, 329}_2 ∧  b^{1, 329}_1 ∧  b^{1, 329}_0 ∧ true) 
c  in CNF:
c    -b^{1, 329}_2 ∨ -b^{1, 329}_1 ∨ -b^{1, 329}_0 ∨ false 
c  in DIMACS:
-2147 -2148 -2149  0

c i = 330
c  -2+1 --> -1
c    ( b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧  p_330) -> ( b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0)
c  in CNF:
c    -b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨  b^{1, 331}_2
c    -b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_1
c    -b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨  b^{1, 331}_0
c  in DIMACS:
-2150 -2151  2152 -330  2153 0
-2150 -2151  2152 -330 -2154 0
-2150 -2151  2152 -330  2155 0

c  -1+1 --> 0
c    ( b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0 ∧  p_330) -> (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧ -b^{1, 331}_0)
c  in CNF:
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_2
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_1
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_0
c  in DIMACS:
-2150  2151 -2152 -330 -2153 0
-2150  2151 -2152 -330 -2154 0
-2150  2151 -2152 -330 -2155 0

c  0+1 --> 1
c    (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧  p_330) -> (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0)
c  in CNF:
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_2
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_1
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨  b^{1, 331}_0
c  in DIMACS:
 2150  2151  2152 -330 -2153 0
 2150  2151  2152 -330 -2154 0
 2150  2151  2152 -330  2155 0

c  1+1 --> 2
c    (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0 ∧  p_330) -> (-b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0)
c  in CNF:
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_2
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨  b^{1, 331}_1
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ -p_330 ∨ -b^{1, 331}_0
c  in DIMACS:
 2150  2151 -2152 -330 -2153 0
 2150  2151 -2152 -330  2154 0
 2150  2151 -2152 -330 -2155 0

c  2+1 --> break 
c    (-b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧  p_330) -> break
c  in CNF:
c     b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 2150 -2151  2152 -330 1162 0


c  2-1 --> 1
c    (-b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧ -p_330) -> (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0)
c  in CNF:
c     b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_2
c     b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_1
c     b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨  b^{1, 331}_0
c  in DIMACS:
 2150 -2151  2152  330 -2153 0
 2150 -2151  2152  330 -2154 0
 2150 -2151  2152  330  2155 0

c  1-1 --> 0
c    (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0 ∧ -p_330) -> (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧ -b^{1, 331}_0)
c  in CNF:
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_2
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_1
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_0
c  in DIMACS:
 2150  2151 -2152  330 -2153 0
 2150  2151 -2152  330 -2154 0
 2150  2151 -2152  330 -2155 0

c  0-1 --> -1
c    (-b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧ -p_330) -> ( b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0)
c  in CNF:
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨  b^{1, 331}_2
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_1
c     b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨  b^{1, 331}_0
c  in DIMACS:
 2150  2151  2152  330  2153 0
 2150  2151  2152  330 -2154 0
 2150  2151  2152  330  2155 0

c  -1-1 --> -2
c    ( b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧  b^{1, 330}_0 ∧ -p_330) -> ( b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0)
c  in CNF:
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨  b^{1, 331}_2
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨  b^{1, 331}_1
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨  p_330 ∨ -b^{1, 331}_0
c  in DIMACS:
-2150  2151 -2152  330  2153 0
-2150  2151 -2152  330  2154 0
-2150  2151 -2152  330 -2155 0

c  -2-1 --> break 
c    ( b^{1, 330}_2 ∧  b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨  b^{1, 330}_0 ∨  p_330 ∨ break
c  in DIMACS:
-2150 -2151  2152  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 330}_2 ∧ -b^{1, 330}_1 ∧ -b^{1, 330}_0 ∧ true) 
c  in CNF:
c    -b^{1, 330}_2 ∨  b^{1, 330}_1 ∨  b^{1, 330}_0 ∨ false 
c  in DIMACS:
-2150  2151  2152  0

c  3 does not represent an automaton state.
c    -(-b^{1, 330}_2 ∧  b^{1, 330}_1 ∧  b^{1, 330}_0 ∧ true) 
c  in CNF:
c     b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ false 
c  in DIMACS:
 2150 -2151 -2152  0
c  -3 does not represent an automaton state.
c    -( b^{1, 330}_2 ∧  b^{1, 330}_1 ∧  b^{1, 330}_0 ∧ true) 
c  in CNF:
c    -b^{1, 330}_2 ∨ -b^{1, 330}_1 ∨ -b^{1, 330}_0 ∨ false 
c  in DIMACS:
-2150 -2151 -2152  0

c i = 331
c  -2+1 --> -1
c    ( b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧  p_331) -> ( b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0)
c  in CNF:
c    -b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨  b^{1, 332}_2
c    -b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_1
c    -b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨  b^{1, 332}_0
c  in DIMACS:
-2153 -2154  2155 -331  2156 0
-2153 -2154  2155 -331 -2157 0
-2153 -2154  2155 -331  2158 0

c  -1+1 --> 0
c    ( b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0 ∧  p_331) -> (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧ -b^{1, 332}_0)
c  in CNF:
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_2
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_1
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_0
c  in DIMACS:
-2153  2154 -2155 -331 -2156 0
-2153  2154 -2155 -331 -2157 0
-2153  2154 -2155 -331 -2158 0

c  0+1 --> 1
c    (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧  p_331) -> (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0)
c  in CNF:
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_2
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_1
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨  b^{1, 332}_0
c  in DIMACS:
 2153  2154  2155 -331 -2156 0
 2153  2154  2155 -331 -2157 0
 2153  2154  2155 -331  2158 0

c  1+1 --> 2
c    (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0 ∧  p_331) -> (-b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0)
c  in CNF:
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_2
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨  b^{1, 332}_1
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ -p_331 ∨ -b^{1, 332}_0
c  in DIMACS:
 2153  2154 -2155 -331 -2156 0
 2153  2154 -2155 -331  2157 0
 2153  2154 -2155 -331 -2158 0

c  2+1 --> break 
c    (-b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧  p_331) -> break
c  in CNF:
c     b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ -p_331 ∨ break
c  in DIMACS:
 2153 -2154  2155 -331 1162 0


c  2-1 --> 1
c    (-b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧ -p_331) -> (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0)
c  in CNF:
c     b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_2
c     b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_1
c     b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨  b^{1, 332}_0
c  in DIMACS:
 2153 -2154  2155  331 -2156 0
 2153 -2154  2155  331 -2157 0
 2153 -2154  2155  331  2158 0

c  1-1 --> 0
c    (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0 ∧ -p_331) -> (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧ -b^{1, 332}_0)
c  in CNF:
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_2
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_1
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_0
c  in DIMACS:
 2153  2154 -2155  331 -2156 0
 2153  2154 -2155  331 -2157 0
 2153  2154 -2155  331 -2158 0

c  0-1 --> -1
c    (-b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧ -p_331) -> ( b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0)
c  in CNF:
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨  b^{1, 332}_2
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_1
c     b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨  b^{1, 332}_0
c  in DIMACS:
 2153  2154  2155  331  2156 0
 2153  2154  2155  331 -2157 0
 2153  2154  2155  331  2158 0

c  -1-1 --> -2
c    ( b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧  b^{1, 331}_0 ∧ -p_331) -> ( b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0)
c  in CNF:
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨  b^{1, 332}_2
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨  b^{1, 332}_1
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨  p_331 ∨ -b^{1, 332}_0
c  in DIMACS:
-2153  2154 -2155  331  2156 0
-2153  2154 -2155  331  2157 0
-2153  2154 -2155  331 -2158 0

c  -2-1 --> break 
c    ( b^{1, 331}_2 ∧  b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧ -p_331) -> break
c  in CNF:
c    -b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨  b^{1, 331}_0 ∨  p_331 ∨ break
c  in DIMACS:
-2153 -2154  2155  331 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 331}_2 ∧ -b^{1, 331}_1 ∧ -b^{1, 331}_0 ∧ true) 
c  in CNF:
c    -b^{1, 331}_2 ∨  b^{1, 331}_1 ∨  b^{1, 331}_0 ∨ false 
c  in DIMACS:
-2153  2154  2155  0

c  3 does not represent an automaton state.
c    -(-b^{1, 331}_2 ∧  b^{1, 331}_1 ∧  b^{1, 331}_0 ∧ true) 
c  in CNF:
c     b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ false 
c  in DIMACS:
 2153 -2154 -2155  0
c  -3 does not represent an automaton state.
c    -( b^{1, 331}_2 ∧  b^{1, 331}_1 ∧  b^{1, 331}_0 ∧ true) 
c  in CNF:
c    -b^{1, 331}_2 ∨ -b^{1, 331}_1 ∨ -b^{1, 331}_0 ∨ false 
c  in DIMACS:
-2153 -2154 -2155  0

c i = 332
c  -2+1 --> -1
c    ( b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧  p_332) -> ( b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0)
c  in CNF:
c    -b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨  b^{1, 333}_2
c    -b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_1
c    -b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨  b^{1, 333}_0
c  in DIMACS:
-2156 -2157  2158 -332  2159 0
-2156 -2157  2158 -332 -2160 0
-2156 -2157  2158 -332  2161 0

c  -1+1 --> 0
c    ( b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0 ∧  p_332) -> (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧ -b^{1, 333}_0)
c  in CNF:
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_2
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_1
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_0
c  in DIMACS:
-2156  2157 -2158 -332 -2159 0
-2156  2157 -2158 -332 -2160 0
-2156  2157 -2158 -332 -2161 0

c  0+1 --> 1
c    (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧  p_332) -> (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0)
c  in CNF:
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_2
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_1
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨  b^{1, 333}_0
c  in DIMACS:
 2156  2157  2158 -332 -2159 0
 2156  2157  2158 -332 -2160 0
 2156  2157  2158 -332  2161 0

c  1+1 --> 2
c    (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0 ∧  p_332) -> (-b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0)
c  in CNF:
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_2
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨  b^{1, 333}_1
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ -p_332 ∨ -b^{1, 333}_0
c  in DIMACS:
 2156  2157 -2158 -332 -2159 0
 2156  2157 -2158 -332  2160 0
 2156  2157 -2158 -332 -2161 0

c  2+1 --> break 
c    (-b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧  p_332) -> break
c  in CNF:
c     b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 2156 -2157  2158 -332 1162 0


c  2-1 --> 1
c    (-b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧ -p_332) -> (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0)
c  in CNF:
c     b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_2
c     b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_1
c     b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨  b^{1, 333}_0
c  in DIMACS:
 2156 -2157  2158  332 -2159 0
 2156 -2157  2158  332 -2160 0
 2156 -2157  2158  332  2161 0

c  1-1 --> 0
c    (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0 ∧ -p_332) -> (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧ -b^{1, 333}_0)
c  in CNF:
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_2
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_1
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_0
c  in DIMACS:
 2156  2157 -2158  332 -2159 0
 2156  2157 -2158  332 -2160 0
 2156  2157 -2158  332 -2161 0

c  0-1 --> -1
c    (-b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧ -p_332) -> ( b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0)
c  in CNF:
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨  b^{1, 333}_2
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_1
c     b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨  b^{1, 333}_0
c  in DIMACS:
 2156  2157  2158  332  2159 0
 2156  2157  2158  332 -2160 0
 2156  2157  2158  332  2161 0

c  -1-1 --> -2
c    ( b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧  b^{1, 332}_0 ∧ -p_332) -> ( b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0)
c  in CNF:
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨  b^{1, 333}_2
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨  b^{1, 333}_1
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨  p_332 ∨ -b^{1, 333}_0
c  in DIMACS:
-2156  2157 -2158  332  2159 0
-2156  2157 -2158  332  2160 0
-2156  2157 -2158  332 -2161 0

c  -2-1 --> break 
c    ( b^{1, 332}_2 ∧  b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨  b^{1, 332}_0 ∨  p_332 ∨ break
c  in DIMACS:
-2156 -2157  2158  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 332}_2 ∧ -b^{1, 332}_1 ∧ -b^{1, 332}_0 ∧ true) 
c  in CNF:
c    -b^{1, 332}_2 ∨  b^{1, 332}_1 ∨  b^{1, 332}_0 ∨ false 
c  in DIMACS:
-2156  2157  2158  0

c  3 does not represent an automaton state.
c    -(-b^{1, 332}_2 ∧  b^{1, 332}_1 ∧  b^{1, 332}_0 ∧ true) 
c  in CNF:
c     b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ false 
c  in DIMACS:
 2156 -2157 -2158  0
c  -3 does not represent an automaton state.
c    -( b^{1, 332}_2 ∧  b^{1, 332}_1 ∧  b^{1, 332}_0 ∧ true) 
c  in CNF:
c    -b^{1, 332}_2 ∨ -b^{1, 332}_1 ∨ -b^{1, 332}_0 ∨ false 
c  in DIMACS:
-2156 -2157 -2158  0

c i = 333
c  -2+1 --> -1
c    ( b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧  p_333) -> ( b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0)
c  in CNF:
c    -b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨  b^{1, 334}_2
c    -b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_1
c    -b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨  b^{1, 334}_0
c  in DIMACS:
-2159 -2160  2161 -333  2162 0
-2159 -2160  2161 -333 -2163 0
-2159 -2160  2161 -333  2164 0

c  -1+1 --> 0
c    ( b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0 ∧  p_333) -> (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧ -b^{1, 334}_0)
c  in CNF:
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_2
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_1
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_0
c  in DIMACS:
-2159  2160 -2161 -333 -2162 0
-2159  2160 -2161 -333 -2163 0
-2159  2160 -2161 -333 -2164 0

c  0+1 --> 1
c    (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧  p_333) -> (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0)
c  in CNF:
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_2
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_1
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨  b^{1, 334}_0
c  in DIMACS:
 2159  2160  2161 -333 -2162 0
 2159  2160  2161 -333 -2163 0
 2159  2160  2161 -333  2164 0

c  1+1 --> 2
c    (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0 ∧  p_333) -> (-b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0)
c  in CNF:
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_2
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨  b^{1, 334}_1
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ -p_333 ∨ -b^{1, 334}_0
c  in DIMACS:
 2159  2160 -2161 -333 -2162 0
 2159  2160 -2161 -333  2163 0
 2159  2160 -2161 -333 -2164 0

c  2+1 --> break 
c    (-b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧  p_333) -> break
c  in CNF:
c     b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 2159 -2160  2161 -333 1162 0


c  2-1 --> 1
c    (-b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧ -p_333) -> (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0)
c  in CNF:
c     b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_2
c     b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_1
c     b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨  b^{1, 334}_0
c  in DIMACS:
 2159 -2160  2161  333 -2162 0
 2159 -2160  2161  333 -2163 0
 2159 -2160  2161  333  2164 0

c  1-1 --> 0
c    (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0 ∧ -p_333) -> (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧ -b^{1, 334}_0)
c  in CNF:
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_2
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_1
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_0
c  in DIMACS:
 2159  2160 -2161  333 -2162 0
 2159  2160 -2161  333 -2163 0
 2159  2160 -2161  333 -2164 0

c  0-1 --> -1
c    (-b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧ -p_333) -> ( b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0)
c  in CNF:
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨  b^{1, 334}_2
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_1
c     b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨  b^{1, 334}_0
c  in DIMACS:
 2159  2160  2161  333  2162 0
 2159  2160  2161  333 -2163 0
 2159  2160  2161  333  2164 0

c  -1-1 --> -2
c    ( b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧  b^{1, 333}_0 ∧ -p_333) -> ( b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0)
c  in CNF:
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨  b^{1, 334}_2
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨  b^{1, 334}_1
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨  p_333 ∨ -b^{1, 334}_0
c  in DIMACS:
-2159  2160 -2161  333  2162 0
-2159  2160 -2161  333  2163 0
-2159  2160 -2161  333 -2164 0

c  -2-1 --> break 
c    ( b^{1, 333}_2 ∧  b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨  b^{1, 333}_0 ∨  p_333 ∨ break
c  in DIMACS:
-2159 -2160  2161  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 333}_2 ∧ -b^{1, 333}_1 ∧ -b^{1, 333}_0 ∧ true) 
c  in CNF:
c    -b^{1, 333}_2 ∨  b^{1, 333}_1 ∨  b^{1, 333}_0 ∨ false 
c  in DIMACS:
-2159  2160  2161  0

c  3 does not represent an automaton state.
c    -(-b^{1, 333}_2 ∧  b^{1, 333}_1 ∧  b^{1, 333}_0 ∧ true) 
c  in CNF:
c     b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ false 
c  in DIMACS:
 2159 -2160 -2161  0
c  -3 does not represent an automaton state.
c    -( b^{1, 333}_2 ∧  b^{1, 333}_1 ∧  b^{1, 333}_0 ∧ true) 
c  in CNF:
c    -b^{1, 333}_2 ∨ -b^{1, 333}_1 ∨ -b^{1, 333}_0 ∨ false 
c  in DIMACS:
-2159 -2160 -2161  0

c i = 334
c  -2+1 --> -1
c    ( b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧  p_334) -> ( b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0)
c  in CNF:
c    -b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨  b^{1, 335}_2
c    -b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_1
c    -b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨  b^{1, 335}_0
c  in DIMACS:
-2162 -2163  2164 -334  2165 0
-2162 -2163  2164 -334 -2166 0
-2162 -2163  2164 -334  2167 0

c  -1+1 --> 0
c    ( b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0 ∧  p_334) -> (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧ -b^{1, 335}_0)
c  in CNF:
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_2
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_1
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_0
c  in DIMACS:
-2162  2163 -2164 -334 -2165 0
-2162  2163 -2164 -334 -2166 0
-2162  2163 -2164 -334 -2167 0

c  0+1 --> 1
c    (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧  p_334) -> (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0)
c  in CNF:
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_2
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_1
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨  b^{1, 335}_0
c  in DIMACS:
 2162  2163  2164 -334 -2165 0
 2162  2163  2164 -334 -2166 0
 2162  2163  2164 -334  2167 0

c  1+1 --> 2
c    (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0 ∧  p_334) -> (-b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0)
c  in CNF:
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_2
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨  b^{1, 335}_1
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ -p_334 ∨ -b^{1, 335}_0
c  in DIMACS:
 2162  2163 -2164 -334 -2165 0
 2162  2163 -2164 -334  2166 0
 2162  2163 -2164 -334 -2167 0

c  2+1 --> break 
c    (-b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧  p_334) -> break
c  in CNF:
c     b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ -p_334 ∨ break
c  in DIMACS:
 2162 -2163  2164 -334 1162 0


c  2-1 --> 1
c    (-b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧ -p_334) -> (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0)
c  in CNF:
c     b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_2
c     b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_1
c     b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨  b^{1, 335}_0
c  in DIMACS:
 2162 -2163  2164  334 -2165 0
 2162 -2163  2164  334 -2166 0
 2162 -2163  2164  334  2167 0

c  1-1 --> 0
c    (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0 ∧ -p_334) -> (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧ -b^{1, 335}_0)
c  in CNF:
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_2
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_1
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_0
c  in DIMACS:
 2162  2163 -2164  334 -2165 0
 2162  2163 -2164  334 -2166 0
 2162  2163 -2164  334 -2167 0

c  0-1 --> -1
c    (-b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧ -p_334) -> ( b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0)
c  in CNF:
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨  b^{1, 335}_2
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_1
c     b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨  b^{1, 335}_0
c  in DIMACS:
 2162  2163  2164  334  2165 0
 2162  2163  2164  334 -2166 0
 2162  2163  2164  334  2167 0

c  -1-1 --> -2
c    ( b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧  b^{1, 334}_0 ∧ -p_334) -> ( b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0)
c  in CNF:
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨  b^{1, 335}_2
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨  b^{1, 335}_1
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨  p_334 ∨ -b^{1, 335}_0
c  in DIMACS:
-2162  2163 -2164  334  2165 0
-2162  2163 -2164  334  2166 0
-2162  2163 -2164  334 -2167 0

c  -2-1 --> break 
c    ( b^{1, 334}_2 ∧  b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧ -p_334) -> break
c  in CNF:
c    -b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨  b^{1, 334}_0 ∨  p_334 ∨ break
c  in DIMACS:
-2162 -2163  2164  334 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 334}_2 ∧ -b^{1, 334}_1 ∧ -b^{1, 334}_0 ∧ true) 
c  in CNF:
c    -b^{1, 334}_2 ∨  b^{1, 334}_1 ∨  b^{1, 334}_0 ∨ false 
c  in DIMACS:
-2162  2163  2164  0

c  3 does not represent an automaton state.
c    -(-b^{1, 334}_2 ∧  b^{1, 334}_1 ∧  b^{1, 334}_0 ∧ true) 
c  in CNF:
c     b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ false 
c  in DIMACS:
 2162 -2163 -2164  0
c  -3 does not represent an automaton state.
c    -( b^{1, 334}_2 ∧  b^{1, 334}_1 ∧  b^{1, 334}_0 ∧ true) 
c  in CNF:
c    -b^{1, 334}_2 ∨ -b^{1, 334}_1 ∨ -b^{1, 334}_0 ∨ false 
c  in DIMACS:
-2162 -2163 -2164  0

c i = 335
c  -2+1 --> -1
c    ( b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧  p_335) -> ( b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0)
c  in CNF:
c    -b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨  b^{1, 336}_2
c    -b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_1
c    -b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨  b^{1, 336}_0
c  in DIMACS:
-2165 -2166  2167 -335  2168 0
-2165 -2166  2167 -335 -2169 0
-2165 -2166  2167 -335  2170 0

c  -1+1 --> 0
c    ( b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0 ∧  p_335) -> (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧ -b^{1, 336}_0)
c  in CNF:
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_2
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_1
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_0
c  in DIMACS:
-2165  2166 -2167 -335 -2168 0
-2165  2166 -2167 -335 -2169 0
-2165  2166 -2167 -335 -2170 0

c  0+1 --> 1
c    (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧  p_335) -> (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0)
c  in CNF:
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_2
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_1
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨  b^{1, 336}_0
c  in DIMACS:
 2165  2166  2167 -335 -2168 0
 2165  2166  2167 -335 -2169 0
 2165  2166  2167 -335  2170 0

c  1+1 --> 2
c    (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0 ∧  p_335) -> (-b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0)
c  in CNF:
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_2
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨  b^{1, 336}_1
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ -p_335 ∨ -b^{1, 336}_0
c  in DIMACS:
 2165  2166 -2167 -335 -2168 0
 2165  2166 -2167 -335  2169 0
 2165  2166 -2167 -335 -2170 0

c  2+1 --> break 
c    (-b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧  p_335) -> break
c  in CNF:
c     b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ -p_335 ∨ break
c  in DIMACS:
 2165 -2166  2167 -335 1162 0


c  2-1 --> 1
c    (-b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧ -p_335) -> (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0)
c  in CNF:
c     b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_2
c     b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_1
c     b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨  b^{1, 336}_0
c  in DIMACS:
 2165 -2166  2167  335 -2168 0
 2165 -2166  2167  335 -2169 0
 2165 -2166  2167  335  2170 0

c  1-1 --> 0
c    (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0 ∧ -p_335) -> (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧ -b^{1, 336}_0)
c  in CNF:
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_2
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_1
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_0
c  in DIMACS:
 2165  2166 -2167  335 -2168 0
 2165  2166 -2167  335 -2169 0
 2165  2166 -2167  335 -2170 0

c  0-1 --> -1
c    (-b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧ -p_335) -> ( b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0)
c  in CNF:
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨  b^{1, 336}_2
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_1
c     b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨  b^{1, 336}_0
c  in DIMACS:
 2165  2166  2167  335  2168 0
 2165  2166  2167  335 -2169 0
 2165  2166  2167  335  2170 0

c  -1-1 --> -2
c    ( b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧  b^{1, 335}_0 ∧ -p_335) -> ( b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0)
c  in CNF:
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨  b^{1, 336}_2
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨  b^{1, 336}_1
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨  p_335 ∨ -b^{1, 336}_0
c  in DIMACS:
-2165  2166 -2167  335  2168 0
-2165  2166 -2167  335  2169 0
-2165  2166 -2167  335 -2170 0

c  -2-1 --> break 
c    ( b^{1, 335}_2 ∧  b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧ -p_335) -> break
c  in CNF:
c    -b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨  b^{1, 335}_0 ∨  p_335 ∨ break
c  in DIMACS:
-2165 -2166  2167  335 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 335}_2 ∧ -b^{1, 335}_1 ∧ -b^{1, 335}_0 ∧ true) 
c  in CNF:
c    -b^{1, 335}_2 ∨  b^{1, 335}_1 ∨  b^{1, 335}_0 ∨ false 
c  in DIMACS:
-2165  2166  2167  0

c  3 does not represent an automaton state.
c    -(-b^{1, 335}_2 ∧  b^{1, 335}_1 ∧  b^{1, 335}_0 ∧ true) 
c  in CNF:
c     b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ false 
c  in DIMACS:
 2165 -2166 -2167  0
c  -3 does not represent an automaton state.
c    -( b^{1, 335}_2 ∧  b^{1, 335}_1 ∧  b^{1, 335}_0 ∧ true) 
c  in CNF:
c    -b^{1, 335}_2 ∨ -b^{1, 335}_1 ∨ -b^{1, 335}_0 ∨ false 
c  in DIMACS:
-2165 -2166 -2167  0

c i = 336
c  -2+1 --> -1
c    ( b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧  p_336) -> ( b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0)
c  in CNF:
c    -b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨  b^{1, 337}_2
c    -b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_1
c    -b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨  b^{1, 337}_0
c  in DIMACS:
-2168 -2169  2170 -336  2171 0
-2168 -2169  2170 -336 -2172 0
-2168 -2169  2170 -336  2173 0

c  -1+1 --> 0
c    ( b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0 ∧  p_336) -> (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧ -b^{1, 337}_0)
c  in CNF:
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_2
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_1
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_0
c  in DIMACS:
-2168  2169 -2170 -336 -2171 0
-2168  2169 -2170 -336 -2172 0
-2168  2169 -2170 -336 -2173 0

c  0+1 --> 1
c    (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧  p_336) -> (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0)
c  in CNF:
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_2
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_1
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨  b^{1, 337}_0
c  in DIMACS:
 2168  2169  2170 -336 -2171 0
 2168  2169  2170 -336 -2172 0
 2168  2169  2170 -336  2173 0

c  1+1 --> 2
c    (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0 ∧  p_336) -> (-b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0)
c  in CNF:
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_2
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨  b^{1, 337}_1
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ -p_336 ∨ -b^{1, 337}_0
c  in DIMACS:
 2168  2169 -2170 -336 -2171 0
 2168  2169 -2170 -336  2172 0
 2168  2169 -2170 -336 -2173 0

c  2+1 --> break 
c    (-b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧  p_336) -> break
c  in CNF:
c     b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 2168 -2169  2170 -336 1162 0


c  2-1 --> 1
c    (-b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧ -p_336) -> (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0)
c  in CNF:
c     b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_2
c     b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_1
c     b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨  b^{1, 337}_0
c  in DIMACS:
 2168 -2169  2170  336 -2171 0
 2168 -2169  2170  336 -2172 0
 2168 -2169  2170  336  2173 0

c  1-1 --> 0
c    (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0 ∧ -p_336) -> (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧ -b^{1, 337}_0)
c  in CNF:
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_2
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_1
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_0
c  in DIMACS:
 2168  2169 -2170  336 -2171 0
 2168  2169 -2170  336 -2172 0
 2168  2169 -2170  336 -2173 0

c  0-1 --> -1
c    (-b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧ -p_336) -> ( b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0)
c  in CNF:
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨  b^{1, 337}_2
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_1
c     b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨  b^{1, 337}_0
c  in DIMACS:
 2168  2169  2170  336  2171 0
 2168  2169  2170  336 -2172 0
 2168  2169  2170  336  2173 0

c  -1-1 --> -2
c    ( b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧  b^{1, 336}_0 ∧ -p_336) -> ( b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0)
c  in CNF:
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨  b^{1, 337}_2
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨  b^{1, 337}_1
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨  p_336 ∨ -b^{1, 337}_0
c  in DIMACS:
-2168  2169 -2170  336  2171 0
-2168  2169 -2170  336  2172 0
-2168  2169 -2170  336 -2173 0

c  -2-1 --> break 
c    ( b^{1, 336}_2 ∧  b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨  b^{1, 336}_0 ∨  p_336 ∨ break
c  in DIMACS:
-2168 -2169  2170  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 336}_2 ∧ -b^{1, 336}_1 ∧ -b^{1, 336}_0 ∧ true) 
c  in CNF:
c    -b^{1, 336}_2 ∨  b^{1, 336}_1 ∨  b^{1, 336}_0 ∨ false 
c  in DIMACS:
-2168  2169  2170  0

c  3 does not represent an automaton state.
c    -(-b^{1, 336}_2 ∧  b^{1, 336}_1 ∧  b^{1, 336}_0 ∧ true) 
c  in CNF:
c     b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ false 
c  in DIMACS:
 2168 -2169 -2170  0
c  -3 does not represent an automaton state.
c    -( b^{1, 336}_2 ∧  b^{1, 336}_1 ∧  b^{1, 336}_0 ∧ true) 
c  in CNF:
c    -b^{1, 336}_2 ∨ -b^{1, 336}_1 ∨ -b^{1, 336}_0 ∨ false 
c  in DIMACS:
-2168 -2169 -2170  0

c i = 337
c  -2+1 --> -1
c    ( b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧  p_337) -> ( b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0)
c  in CNF:
c    -b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨  b^{1, 338}_2
c    -b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_1
c    -b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨  b^{1, 338}_0
c  in DIMACS:
-2171 -2172  2173 -337  2174 0
-2171 -2172  2173 -337 -2175 0
-2171 -2172  2173 -337  2176 0

c  -1+1 --> 0
c    ( b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0 ∧  p_337) -> (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧ -b^{1, 338}_0)
c  in CNF:
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_2
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_1
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_0
c  in DIMACS:
-2171  2172 -2173 -337 -2174 0
-2171  2172 -2173 -337 -2175 0
-2171  2172 -2173 -337 -2176 0

c  0+1 --> 1
c    (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧  p_337) -> (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0)
c  in CNF:
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_2
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_1
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨  b^{1, 338}_0
c  in DIMACS:
 2171  2172  2173 -337 -2174 0
 2171  2172  2173 -337 -2175 0
 2171  2172  2173 -337  2176 0

c  1+1 --> 2
c    (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0 ∧  p_337) -> (-b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0)
c  in CNF:
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_2
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨  b^{1, 338}_1
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ -p_337 ∨ -b^{1, 338}_0
c  in DIMACS:
 2171  2172 -2173 -337 -2174 0
 2171  2172 -2173 -337  2175 0
 2171  2172 -2173 -337 -2176 0

c  2+1 --> break 
c    (-b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧  p_337) -> break
c  in CNF:
c     b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ -p_337 ∨ break
c  in DIMACS:
 2171 -2172  2173 -337 1162 0


c  2-1 --> 1
c    (-b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧ -p_337) -> (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0)
c  in CNF:
c     b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_2
c     b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_1
c     b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨  b^{1, 338}_0
c  in DIMACS:
 2171 -2172  2173  337 -2174 0
 2171 -2172  2173  337 -2175 0
 2171 -2172  2173  337  2176 0

c  1-1 --> 0
c    (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0 ∧ -p_337) -> (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧ -b^{1, 338}_0)
c  in CNF:
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_2
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_1
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_0
c  in DIMACS:
 2171  2172 -2173  337 -2174 0
 2171  2172 -2173  337 -2175 0
 2171  2172 -2173  337 -2176 0

c  0-1 --> -1
c    (-b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧ -p_337) -> ( b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0)
c  in CNF:
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨  b^{1, 338}_2
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_1
c     b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨  b^{1, 338}_0
c  in DIMACS:
 2171  2172  2173  337  2174 0
 2171  2172  2173  337 -2175 0
 2171  2172  2173  337  2176 0

c  -1-1 --> -2
c    ( b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧  b^{1, 337}_0 ∧ -p_337) -> ( b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0)
c  in CNF:
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨  b^{1, 338}_2
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨  b^{1, 338}_1
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨  p_337 ∨ -b^{1, 338}_0
c  in DIMACS:
-2171  2172 -2173  337  2174 0
-2171  2172 -2173  337  2175 0
-2171  2172 -2173  337 -2176 0

c  -2-1 --> break 
c    ( b^{1, 337}_2 ∧  b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧ -p_337) -> break
c  in CNF:
c    -b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨  b^{1, 337}_0 ∨  p_337 ∨ break
c  in DIMACS:
-2171 -2172  2173  337 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 337}_2 ∧ -b^{1, 337}_1 ∧ -b^{1, 337}_0 ∧ true) 
c  in CNF:
c    -b^{1, 337}_2 ∨  b^{1, 337}_1 ∨  b^{1, 337}_0 ∨ false 
c  in DIMACS:
-2171  2172  2173  0

c  3 does not represent an automaton state.
c    -(-b^{1, 337}_2 ∧  b^{1, 337}_1 ∧  b^{1, 337}_0 ∧ true) 
c  in CNF:
c     b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ false 
c  in DIMACS:
 2171 -2172 -2173  0
c  -3 does not represent an automaton state.
c    -( b^{1, 337}_2 ∧  b^{1, 337}_1 ∧  b^{1, 337}_0 ∧ true) 
c  in CNF:
c    -b^{1, 337}_2 ∨ -b^{1, 337}_1 ∨ -b^{1, 337}_0 ∨ false 
c  in DIMACS:
-2171 -2172 -2173  0

c i = 338
c  -2+1 --> -1
c    ( b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧  p_338) -> ( b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0)
c  in CNF:
c    -b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨  b^{1, 339}_2
c    -b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_1
c    -b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨  b^{1, 339}_0
c  in DIMACS:
-2174 -2175  2176 -338  2177 0
-2174 -2175  2176 -338 -2178 0
-2174 -2175  2176 -338  2179 0

c  -1+1 --> 0
c    ( b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0 ∧  p_338) -> (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧ -b^{1, 339}_0)
c  in CNF:
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_2
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_1
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_0
c  in DIMACS:
-2174  2175 -2176 -338 -2177 0
-2174  2175 -2176 -338 -2178 0
-2174  2175 -2176 -338 -2179 0

c  0+1 --> 1
c    (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧  p_338) -> (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0)
c  in CNF:
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_2
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_1
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨  b^{1, 339}_0
c  in DIMACS:
 2174  2175  2176 -338 -2177 0
 2174  2175  2176 -338 -2178 0
 2174  2175  2176 -338  2179 0

c  1+1 --> 2
c    (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0 ∧  p_338) -> (-b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0)
c  in CNF:
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_2
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨  b^{1, 339}_1
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ -p_338 ∨ -b^{1, 339}_0
c  in DIMACS:
 2174  2175 -2176 -338 -2177 0
 2174  2175 -2176 -338  2178 0
 2174  2175 -2176 -338 -2179 0

c  2+1 --> break 
c    (-b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧  p_338) -> break
c  in CNF:
c     b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 2174 -2175  2176 -338 1162 0


c  2-1 --> 1
c    (-b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧ -p_338) -> (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0)
c  in CNF:
c     b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_2
c     b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_1
c     b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨  b^{1, 339}_0
c  in DIMACS:
 2174 -2175  2176  338 -2177 0
 2174 -2175  2176  338 -2178 0
 2174 -2175  2176  338  2179 0

c  1-1 --> 0
c    (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0 ∧ -p_338) -> (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧ -b^{1, 339}_0)
c  in CNF:
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_2
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_1
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_0
c  in DIMACS:
 2174  2175 -2176  338 -2177 0
 2174  2175 -2176  338 -2178 0
 2174  2175 -2176  338 -2179 0

c  0-1 --> -1
c    (-b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧ -p_338) -> ( b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0)
c  in CNF:
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨  b^{1, 339}_2
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_1
c     b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨  b^{1, 339}_0
c  in DIMACS:
 2174  2175  2176  338  2177 0
 2174  2175  2176  338 -2178 0
 2174  2175  2176  338  2179 0

c  -1-1 --> -2
c    ( b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧  b^{1, 338}_0 ∧ -p_338) -> ( b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0)
c  in CNF:
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨  b^{1, 339}_2
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨  b^{1, 339}_1
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨  p_338 ∨ -b^{1, 339}_0
c  in DIMACS:
-2174  2175 -2176  338  2177 0
-2174  2175 -2176  338  2178 0
-2174  2175 -2176  338 -2179 0

c  -2-1 --> break 
c    ( b^{1, 338}_2 ∧  b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨  b^{1, 338}_0 ∨  p_338 ∨ break
c  in DIMACS:
-2174 -2175  2176  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 338}_2 ∧ -b^{1, 338}_1 ∧ -b^{1, 338}_0 ∧ true) 
c  in CNF:
c    -b^{1, 338}_2 ∨  b^{1, 338}_1 ∨  b^{1, 338}_0 ∨ false 
c  in DIMACS:
-2174  2175  2176  0

c  3 does not represent an automaton state.
c    -(-b^{1, 338}_2 ∧  b^{1, 338}_1 ∧  b^{1, 338}_0 ∧ true) 
c  in CNF:
c     b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ false 
c  in DIMACS:
 2174 -2175 -2176  0
c  -3 does not represent an automaton state.
c    -( b^{1, 338}_2 ∧  b^{1, 338}_1 ∧  b^{1, 338}_0 ∧ true) 
c  in CNF:
c    -b^{1, 338}_2 ∨ -b^{1, 338}_1 ∨ -b^{1, 338}_0 ∨ false 
c  in DIMACS:
-2174 -2175 -2176  0

c i = 339
c  -2+1 --> -1
c    ( b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧  p_339) -> ( b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0)
c  in CNF:
c    -b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨  b^{1, 340}_2
c    -b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_1
c    -b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨  b^{1, 340}_0
c  in DIMACS:
-2177 -2178  2179 -339  2180 0
-2177 -2178  2179 -339 -2181 0
-2177 -2178  2179 -339  2182 0

c  -1+1 --> 0
c    ( b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0 ∧  p_339) -> (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧ -b^{1, 340}_0)
c  in CNF:
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_2
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_1
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_0
c  in DIMACS:
-2177  2178 -2179 -339 -2180 0
-2177  2178 -2179 -339 -2181 0
-2177  2178 -2179 -339 -2182 0

c  0+1 --> 1
c    (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧  p_339) -> (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0)
c  in CNF:
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_2
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_1
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨  b^{1, 340}_0
c  in DIMACS:
 2177  2178  2179 -339 -2180 0
 2177  2178  2179 -339 -2181 0
 2177  2178  2179 -339  2182 0

c  1+1 --> 2
c    (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0 ∧  p_339) -> (-b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0)
c  in CNF:
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_2
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨  b^{1, 340}_1
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ -p_339 ∨ -b^{1, 340}_0
c  in DIMACS:
 2177  2178 -2179 -339 -2180 0
 2177  2178 -2179 -339  2181 0
 2177  2178 -2179 -339 -2182 0

c  2+1 --> break 
c    (-b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧  p_339) -> break
c  in CNF:
c     b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ -p_339 ∨ break
c  in DIMACS:
 2177 -2178  2179 -339 1162 0


c  2-1 --> 1
c    (-b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧ -p_339) -> (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0)
c  in CNF:
c     b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_2
c     b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_1
c     b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨  b^{1, 340}_0
c  in DIMACS:
 2177 -2178  2179  339 -2180 0
 2177 -2178  2179  339 -2181 0
 2177 -2178  2179  339  2182 0

c  1-1 --> 0
c    (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0 ∧ -p_339) -> (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧ -b^{1, 340}_0)
c  in CNF:
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_2
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_1
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_0
c  in DIMACS:
 2177  2178 -2179  339 -2180 0
 2177  2178 -2179  339 -2181 0
 2177  2178 -2179  339 -2182 0

c  0-1 --> -1
c    (-b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧ -p_339) -> ( b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0)
c  in CNF:
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨  b^{1, 340}_2
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_1
c     b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨  b^{1, 340}_0
c  in DIMACS:
 2177  2178  2179  339  2180 0
 2177  2178  2179  339 -2181 0
 2177  2178  2179  339  2182 0

c  -1-1 --> -2
c    ( b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧  b^{1, 339}_0 ∧ -p_339) -> ( b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0)
c  in CNF:
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨  b^{1, 340}_2
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨  b^{1, 340}_1
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨  p_339 ∨ -b^{1, 340}_0
c  in DIMACS:
-2177  2178 -2179  339  2180 0
-2177  2178 -2179  339  2181 0
-2177  2178 -2179  339 -2182 0

c  -2-1 --> break 
c    ( b^{1, 339}_2 ∧  b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧ -p_339) -> break
c  in CNF:
c    -b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨  b^{1, 339}_0 ∨  p_339 ∨ break
c  in DIMACS:
-2177 -2178  2179  339 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 339}_2 ∧ -b^{1, 339}_1 ∧ -b^{1, 339}_0 ∧ true) 
c  in CNF:
c    -b^{1, 339}_2 ∨  b^{1, 339}_1 ∨  b^{1, 339}_0 ∨ false 
c  in DIMACS:
-2177  2178  2179  0

c  3 does not represent an automaton state.
c    -(-b^{1, 339}_2 ∧  b^{1, 339}_1 ∧  b^{1, 339}_0 ∧ true) 
c  in CNF:
c     b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ false 
c  in DIMACS:
 2177 -2178 -2179  0
c  -3 does not represent an automaton state.
c    -( b^{1, 339}_2 ∧  b^{1, 339}_1 ∧  b^{1, 339}_0 ∧ true) 
c  in CNF:
c    -b^{1, 339}_2 ∨ -b^{1, 339}_1 ∨ -b^{1, 339}_0 ∨ false 
c  in DIMACS:
-2177 -2178 -2179  0

c i = 340
c  -2+1 --> -1
c    ( b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧  p_340) -> ( b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0)
c  in CNF:
c    -b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨  b^{1, 341}_2
c    -b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_1
c    -b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨  b^{1, 341}_0
c  in DIMACS:
-2180 -2181  2182 -340  2183 0
-2180 -2181  2182 -340 -2184 0
-2180 -2181  2182 -340  2185 0

c  -1+1 --> 0
c    ( b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0 ∧  p_340) -> (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧ -b^{1, 341}_0)
c  in CNF:
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_2
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_1
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_0
c  in DIMACS:
-2180  2181 -2182 -340 -2183 0
-2180  2181 -2182 -340 -2184 0
-2180  2181 -2182 -340 -2185 0

c  0+1 --> 1
c    (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧  p_340) -> (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0)
c  in CNF:
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_2
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_1
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨  b^{1, 341}_0
c  in DIMACS:
 2180  2181  2182 -340 -2183 0
 2180  2181  2182 -340 -2184 0
 2180  2181  2182 -340  2185 0

c  1+1 --> 2
c    (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0 ∧  p_340) -> (-b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0)
c  in CNF:
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_2
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨  b^{1, 341}_1
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ -p_340 ∨ -b^{1, 341}_0
c  in DIMACS:
 2180  2181 -2182 -340 -2183 0
 2180  2181 -2182 -340  2184 0
 2180  2181 -2182 -340 -2185 0

c  2+1 --> break 
c    (-b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧  p_340) -> break
c  in CNF:
c     b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 2180 -2181  2182 -340 1162 0


c  2-1 --> 1
c    (-b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧ -p_340) -> (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0)
c  in CNF:
c     b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_2
c     b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_1
c     b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨  b^{1, 341}_0
c  in DIMACS:
 2180 -2181  2182  340 -2183 0
 2180 -2181  2182  340 -2184 0
 2180 -2181  2182  340  2185 0

c  1-1 --> 0
c    (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0 ∧ -p_340) -> (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧ -b^{1, 341}_0)
c  in CNF:
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_2
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_1
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_0
c  in DIMACS:
 2180  2181 -2182  340 -2183 0
 2180  2181 -2182  340 -2184 0
 2180  2181 -2182  340 -2185 0

c  0-1 --> -1
c    (-b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧ -p_340) -> ( b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0)
c  in CNF:
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨  b^{1, 341}_2
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_1
c     b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨  b^{1, 341}_0
c  in DIMACS:
 2180  2181  2182  340  2183 0
 2180  2181  2182  340 -2184 0
 2180  2181  2182  340  2185 0

c  -1-1 --> -2
c    ( b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧  b^{1, 340}_0 ∧ -p_340) -> ( b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0)
c  in CNF:
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨  b^{1, 341}_2
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨  b^{1, 341}_1
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨  p_340 ∨ -b^{1, 341}_0
c  in DIMACS:
-2180  2181 -2182  340  2183 0
-2180  2181 -2182  340  2184 0
-2180  2181 -2182  340 -2185 0

c  -2-1 --> break 
c    ( b^{1, 340}_2 ∧  b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨  b^{1, 340}_0 ∨  p_340 ∨ break
c  in DIMACS:
-2180 -2181  2182  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 340}_2 ∧ -b^{1, 340}_1 ∧ -b^{1, 340}_0 ∧ true) 
c  in CNF:
c    -b^{1, 340}_2 ∨  b^{1, 340}_1 ∨  b^{1, 340}_0 ∨ false 
c  in DIMACS:
-2180  2181  2182  0

c  3 does not represent an automaton state.
c    -(-b^{1, 340}_2 ∧  b^{1, 340}_1 ∧  b^{1, 340}_0 ∧ true) 
c  in CNF:
c     b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ false 
c  in DIMACS:
 2180 -2181 -2182  0
c  -3 does not represent an automaton state.
c    -( b^{1, 340}_2 ∧  b^{1, 340}_1 ∧  b^{1, 340}_0 ∧ true) 
c  in CNF:
c    -b^{1, 340}_2 ∨ -b^{1, 340}_1 ∨ -b^{1, 340}_0 ∨ false 
c  in DIMACS:
-2180 -2181 -2182  0

c i = 341
c  -2+1 --> -1
c    ( b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧  p_341) -> ( b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0)
c  in CNF:
c    -b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨  b^{1, 342}_2
c    -b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_1
c    -b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨  b^{1, 342}_0
c  in DIMACS:
-2183 -2184  2185 -341  2186 0
-2183 -2184  2185 -341 -2187 0
-2183 -2184  2185 -341  2188 0

c  -1+1 --> 0
c    ( b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0 ∧  p_341) -> (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧ -b^{1, 342}_0)
c  in CNF:
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_2
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_1
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_0
c  in DIMACS:
-2183  2184 -2185 -341 -2186 0
-2183  2184 -2185 -341 -2187 0
-2183  2184 -2185 -341 -2188 0

c  0+1 --> 1
c    (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧  p_341) -> (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0)
c  in CNF:
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_2
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_1
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨  b^{1, 342}_0
c  in DIMACS:
 2183  2184  2185 -341 -2186 0
 2183  2184  2185 -341 -2187 0
 2183  2184  2185 -341  2188 0

c  1+1 --> 2
c    (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0 ∧  p_341) -> (-b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0)
c  in CNF:
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_2
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨  b^{1, 342}_1
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ -p_341 ∨ -b^{1, 342}_0
c  in DIMACS:
 2183  2184 -2185 -341 -2186 0
 2183  2184 -2185 -341  2187 0
 2183  2184 -2185 -341 -2188 0

c  2+1 --> break 
c    (-b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧  p_341) -> break
c  in CNF:
c     b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ -p_341 ∨ break
c  in DIMACS:
 2183 -2184  2185 -341 1162 0


c  2-1 --> 1
c    (-b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧ -p_341) -> (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0)
c  in CNF:
c     b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_2
c     b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_1
c     b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨  b^{1, 342}_0
c  in DIMACS:
 2183 -2184  2185  341 -2186 0
 2183 -2184  2185  341 -2187 0
 2183 -2184  2185  341  2188 0

c  1-1 --> 0
c    (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0 ∧ -p_341) -> (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧ -b^{1, 342}_0)
c  in CNF:
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_2
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_1
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_0
c  in DIMACS:
 2183  2184 -2185  341 -2186 0
 2183  2184 -2185  341 -2187 0
 2183  2184 -2185  341 -2188 0

c  0-1 --> -1
c    (-b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧ -p_341) -> ( b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0)
c  in CNF:
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨  b^{1, 342}_2
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_1
c     b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨  b^{1, 342}_0
c  in DIMACS:
 2183  2184  2185  341  2186 0
 2183  2184  2185  341 -2187 0
 2183  2184  2185  341  2188 0

c  -1-1 --> -2
c    ( b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧  b^{1, 341}_0 ∧ -p_341) -> ( b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0)
c  in CNF:
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨  b^{1, 342}_2
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨  b^{1, 342}_1
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨  p_341 ∨ -b^{1, 342}_0
c  in DIMACS:
-2183  2184 -2185  341  2186 0
-2183  2184 -2185  341  2187 0
-2183  2184 -2185  341 -2188 0

c  -2-1 --> break 
c    ( b^{1, 341}_2 ∧  b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧ -p_341) -> break
c  in CNF:
c    -b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨  b^{1, 341}_0 ∨  p_341 ∨ break
c  in DIMACS:
-2183 -2184  2185  341 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 341}_2 ∧ -b^{1, 341}_1 ∧ -b^{1, 341}_0 ∧ true) 
c  in CNF:
c    -b^{1, 341}_2 ∨  b^{1, 341}_1 ∨  b^{1, 341}_0 ∨ false 
c  in DIMACS:
-2183  2184  2185  0

c  3 does not represent an automaton state.
c    -(-b^{1, 341}_2 ∧  b^{1, 341}_1 ∧  b^{1, 341}_0 ∧ true) 
c  in CNF:
c     b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ false 
c  in DIMACS:
 2183 -2184 -2185  0
c  -3 does not represent an automaton state.
c    -( b^{1, 341}_2 ∧  b^{1, 341}_1 ∧  b^{1, 341}_0 ∧ true) 
c  in CNF:
c    -b^{1, 341}_2 ∨ -b^{1, 341}_1 ∨ -b^{1, 341}_0 ∨ false 
c  in DIMACS:
-2183 -2184 -2185  0

c i = 342
c  -2+1 --> -1
c    ( b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧  p_342) -> ( b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0)
c  in CNF:
c    -b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨  b^{1, 343}_2
c    -b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_1
c    -b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨  b^{1, 343}_0
c  in DIMACS:
-2186 -2187  2188 -342  2189 0
-2186 -2187  2188 -342 -2190 0
-2186 -2187  2188 -342  2191 0

c  -1+1 --> 0
c    ( b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0 ∧  p_342) -> (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧ -b^{1, 343}_0)
c  in CNF:
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_2
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_1
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_0
c  in DIMACS:
-2186  2187 -2188 -342 -2189 0
-2186  2187 -2188 -342 -2190 0
-2186  2187 -2188 -342 -2191 0

c  0+1 --> 1
c    (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧  p_342) -> (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0)
c  in CNF:
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_2
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_1
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨  b^{1, 343}_0
c  in DIMACS:
 2186  2187  2188 -342 -2189 0
 2186  2187  2188 -342 -2190 0
 2186  2187  2188 -342  2191 0

c  1+1 --> 2
c    (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0 ∧  p_342) -> (-b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0)
c  in CNF:
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_2
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨  b^{1, 343}_1
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ -p_342 ∨ -b^{1, 343}_0
c  in DIMACS:
 2186  2187 -2188 -342 -2189 0
 2186  2187 -2188 -342  2190 0
 2186  2187 -2188 -342 -2191 0

c  2+1 --> break 
c    (-b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧  p_342) -> break
c  in CNF:
c     b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 2186 -2187  2188 -342 1162 0


c  2-1 --> 1
c    (-b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧ -p_342) -> (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0)
c  in CNF:
c     b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_2
c     b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_1
c     b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨  b^{1, 343}_0
c  in DIMACS:
 2186 -2187  2188  342 -2189 0
 2186 -2187  2188  342 -2190 0
 2186 -2187  2188  342  2191 0

c  1-1 --> 0
c    (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0 ∧ -p_342) -> (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧ -b^{1, 343}_0)
c  in CNF:
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_2
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_1
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_0
c  in DIMACS:
 2186  2187 -2188  342 -2189 0
 2186  2187 -2188  342 -2190 0
 2186  2187 -2188  342 -2191 0

c  0-1 --> -1
c    (-b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧ -p_342) -> ( b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0)
c  in CNF:
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨  b^{1, 343}_2
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_1
c     b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨  b^{1, 343}_0
c  in DIMACS:
 2186  2187  2188  342  2189 0
 2186  2187  2188  342 -2190 0
 2186  2187  2188  342  2191 0

c  -1-1 --> -2
c    ( b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧  b^{1, 342}_0 ∧ -p_342) -> ( b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0)
c  in CNF:
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨  b^{1, 343}_2
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨  b^{1, 343}_1
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨  p_342 ∨ -b^{1, 343}_0
c  in DIMACS:
-2186  2187 -2188  342  2189 0
-2186  2187 -2188  342  2190 0
-2186  2187 -2188  342 -2191 0

c  -2-1 --> break 
c    ( b^{1, 342}_2 ∧  b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨  b^{1, 342}_0 ∨  p_342 ∨ break
c  in DIMACS:
-2186 -2187  2188  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 342}_2 ∧ -b^{1, 342}_1 ∧ -b^{1, 342}_0 ∧ true) 
c  in CNF:
c    -b^{1, 342}_2 ∨  b^{1, 342}_1 ∨  b^{1, 342}_0 ∨ false 
c  in DIMACS:
-2186  2187  2188  0

c  3 does not represent an automaton state.
c    -(-b^{1, 342}_2 ∧  b^{1, 342}_1 ∧  b^{1, 342}_0 ∧ true) 
c  in CNF:
c     b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ false 
c  in DIMACS:
 2186 -2187 -2188  0
c  -3 does not represent an automaton state.
c    -( b^{1, 342}_2 ∧  b^{1, 342}_1 ∧  b^{1, 342}_0 ∧ true) 
c  in CNF:
c    -b^{1, 342}_2 ∨ -b^{1, 342}_1 ∨ -b^{1, 342}_0 ∨ false 
c  in DIMACS:
-2186 -2187 -2188  0

c i = 343
c  -2+1 --> -1
c    ( b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧  p_343) -> ( b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0)
c  in CNF:
c    -b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨  b^{1, 344}_2
c    -b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_1
c    -b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨  b^{1, 344}_0
c  in DIMACS:
-2189 -2190  2191 -343  2192 0
-2189 -2190  2191 -343 -2193 0
-2189 -2190  2191 -343  2194 0

c  -1+1 --> 0
c    ( b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0 ∧  p_343) -> (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧ -b^{1, 344}_0)
c  in CNF:
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_2
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_1
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_0
c  in DIMACS:
-2189  2190 -2191 -343 -2192 0
-2189  2190 -2191 -343 -2193 0
-2189  2190 -2191 -343 -2194 0

c  0+1 --> 1
c    (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧  p_343) -> (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0)
c  in CNF:
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_2
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_1
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨  b^{1, 344}_0
c  in DIMACS:
 2189  2190  2191 -343 -2192 0
 2189  2190  2191 -343 -2193 0
 2189  2190  2191 -343  2194 0

c  1+1 --> 2
c    (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0 ∧  p_343) -> (-b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0)
c  in CNF:
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_2
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨  b^{1, 344}_1
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ -p_343 ∨ -b^{1, 344}_0
c  in DIMACS:
 2189  2190 -2191 -343 -2192 0
 2189  2190 -2191 -343  2193 0
 2189  2190 -2191 -343 -2194 0

c  2+1 --> break 
c    (-b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧  p_343) -> break
c  in CNF:
c     b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ -p_343 ∨ break
c  in DIMACS:
 2189 -2190  2191 -343 1162 0


c  2-1 --> 1
c    (-b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧ -p_343) -> (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0)
c  in CNF:
c     b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_2
c     b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_1
c     b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨  b^{1, 344}_0
c  in DIMACS:
 2189 -2190  2191  343 -2192 0
 2189 -2190  2191  343 -2193 0
 2189 -2190  2191  343  2194 0

c  1-1 --> 0
c    (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0 ∧ -p_343) -> (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧ -b^{1, 344}_0)
c  in CNF:
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_2
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_1
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_0
c  in DIMACS:
 2189  2190 -2191  343 -2192 0
 2189  2190 -2191  343 -2193 0
 2189  2190 -2191  343 -2194 0

c  0-1 --> -1
c    (-b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧ -p_343) -> ( b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0)
c  in CNF:
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨  b^{1, 344}_2
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_1
c     b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨  b^{1, 344}_0
c  in DIMACS:
 2189  2190  2191  343  2192 0
 2189  2190  2191  343 -2193 0
 2189  2190  2191  343  2194 0

c  -1-1 --> -2
c    ( b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧  b^{1, 343}_0 ∧ -p_343) -> ( b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0)
c  in CNF:
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨  b^{1, 344}_2
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨  b^{1, 344}_1
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨  p_343 ∨ -b^{1, 344}_0
c  in DIMACS:
-2189  2190 -2191  343  2192 0
-2189  2190 -2191  343  2193 0
-2189  2190 -2191  343 -2194 0

c  -2-1 --> break 
c    ( b^{1, 343}_2 ∧  b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧ -p_343) -> break
c  in CNF:
c    -b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨  b^{1, 343}_0 ∨  p_343 ∨ break
c  in DIMACS:
-2189 -2190  2191  343 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 343}_2 ∧ -b^{1, 343}_1 ∧ -b^{1, 343}_0 ∧ true) 
c  in CNF:
c    -b^{1, 343}_2 ∨  b^{1, 343}_1 ∨  b^{1, 343}_0 ∨ false 
c  in DIMACS:
-2189  2190  2191  0

c  3 does not represent an automaton state.
c    -(-b^{1, 343}_2 ∧  b^{1, 343}_1 ∧  b^{1, 343}_0 ∧ true) 
c  in CNF:
c     b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ false 
c  in DIMACS:
 2189 -2190 -2191  0
c  -3 does not represent an automaton state.
c    -( b^{1, 343}_2 ∧  b^{1, 343}_1 ∧  b^{1, 343}_0 ∧ true) 
c  in CNF:
c    -b^{1, 343}_2 ∨ -b^{1, 343}_1 ∨ -b^{1, 343}_0 ∨ false 
c  in DIMACS:
-2189 -2190 -2191  0

c i = 344
c  -2+1 --> -1
c    ( b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧  p_344) -> ( b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0)
c  in CNF:
c    -b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨  b^{1, 345}_2
c    -b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_1
c    -b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨  b^{1, 345}_0
c  in DIMACS:
-2192 -2193  2194 -344  2195 0
-2192 -2193  2194 -344 -2196 0
-2192 -2193  2194 -344  2197 0

c  -1+1 --> 0
c    ( b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0 ∧  p_344) -> (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧ -b^{1, 345}_0)
c  in CNF:
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_2
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_1
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_0
c  in DIMACS:
-2192  2193 -2194 -344 -2195 0
-2192  2193 -2194 -344 -2196 0
-2192  2193 -2194 -344 -2197 0

c  0+1 --> 1
c    (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧  p_344) -> (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0)
c  in CNF:
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_2
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_1
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨  b^{1, 345}_0
c  in DIMACS:
 2192  2193  2194 -344 -2195 0
 2192  2193  2194 -344 -2196 0
 2192  2193  2194 -344  2197 0

c  1+1 --> 2
c    (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0 ∧  p_344) -> (-b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0)
c  in CNF:
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_2
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨  b^{1, 345}_1
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ -p_344 ∨ -b^{1, 345}_0
c  in DIMACS:
 2192  2193 -2194 -344 -2195 0
 2192  2193 -2194 -344  2196 0
 2192  2193 -2194 -344 -2197 0

c  2+1 --> break 
c    (-b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧  p_344) -> break
c  in CNF:
c     b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 2192 -2193  2194 -344 1162 0


c  2-1 --> 1
c    (-b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧ -p_344) -> (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0)
c  in CNF:
c     b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_2
c     b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_1
c     b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨  b^{1, 345}_0
c  in DIMACS:
 2192 -2193  2194  344 -2195 0
 2192 -2193  2194  344 -2196 0
 2192 -2193  2194  344  2197 0

c  1-1 --> 0
c    (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0 ∧ -p_344) -> (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧ -b^{1, 345}_0)
c  in CNF:
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_2
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_1
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_0
c  in DIMACS:
 2192  2193 -2194  344 -2195 0
 2192  2193 -2194  344 -2196 0
 2192  2193 -2194  344 -2197 0

c  0-1 --> -1
c    (-b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧ -p_344) -> ( b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0)
c  in CNF:
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨  b^{1, 345}_2
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_1
c     b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨  b^{1, 345}_0
c  in DIMACS:
 2192  2193  2194  344  2195 0
 2192  2193  2194  344 -2196 0
 2192  2193  2194  344  2197 0

c  -1-1 --> -2
c    ( b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧  b^{1, 344}_0 ∧ -p_344) -> ( b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0)
c  in CNF:
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨  b^{1, 345}_2
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨  b^{1, 345}_1
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨  p_344 ∨ -b^{1, 345}_0
c  in DIMACS:
-2192  2193 -2194  344  2195 0
-2192  2193 -2194  344  2196 0
-2192  2193 -2194  344 -2197 0

c  -2-1 --> break 
c    ( b^{1, 344}_2 ∧  b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨  b^{1, 344}_0 ∨  p_344 ∨ break
c  in DIMACS:
-2192 -2193  2194  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 344}_2 ∧ -b^{1, 344}_1 ∧ -b^{1, 344}_0 ∧ true) 
c  in CNF:
c    -b^{1, 344}_2 ∨  b^{1, 344}_1 ∨  b^{1, 344}_0 ∨ false 
c  in DIMACS:
-2192  2193  2194  0

c  3 does not represent an automaton state.
c    -(-b^{1, 344}_2 ∧  b^{1, 344}_1 ∧  b^{1, 344}_0 ∧ true) 
c  in CNF:
c     b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ false 
c  in DIMACS:
 2192 -2193 -2194  0
c  -3 does not represent an automaton state.
c    -( b^{1, 344}_2 ∧  b^{1, 344}_1 ∧  b^{1, 344}_0 ∧ true) 
c  in CNF:
c    -b^{1, 344}_2 ∨ -b^{1, 344}_1 ∨ -b^{1, 344}_0 ∨ false 
c  in DIMACS:
-2192 -2193 -2194  0

c i = 345
c  -2+1 --> -1
c    ( b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧  p_345) -> ( b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0)
c  in CNF:
c    -b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨  b^{1, 346}_2
c    -b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_1
c    -b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨  b^{1, 346}_0
c  in DIMACS:
-2195 -2196  2197 -345  2198 0
-2195 -2196  2197 -345 -2199 0
-2195 -2196  2197 -345  2200 0

c  -1+1 --> 0
c    ( b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0 ∧  p_345) -> (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧ -b^{1, 346}_0)
c  in CNF:
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_2
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_1
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_0
c  in DIMACS:
-2195  2196 -2197 -345 -2198 0
-2195  2196 -2197 -345 -2199 0
-2195  2196 -2197 -345 -2200 0

c  0+1 --> 1
c    (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧  p_345) -> (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0)
c  in CNF:
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_2
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_1
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨  b^{1, 346}_0
c  in DIMACS:
 2195  2196  2197 -345 -2198 0
 2195  2196  2197 -345 -2199 0
 2195  2196  2197 -345  2200 0

c  1+1 --> 2
c    (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0 ∧  p_345) -> (-b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0)
c  in CNF:
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_2
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨  b^{1, 346}_1
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ -p_345 ∨ -b^{1, 346}_0
c  in DIMACS:
 2195  2196 -2197 -345 -2198 0
 2195  2196 -2197 -345  2199 0
 2195  2196 -2197 -345 -2200 0

c  2+1 --> break 
c    (-b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧  p_345) -> break
c  in CNF:
c     b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 2195 -2196  2197 -345 1162 0


c  2-1 --> 1
c    (-b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧ -p_345) -> (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0)
c  in CNF:
c     b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_2
c     b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_1
c     b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨  b^{1, 346}_0
c  in DIMACS:
 2195 -2196  2197  345 -2198 0
 2195 -2196  2197  345 -2199 0
 2195 -2196  2197  345  2200 0

c  1-1 --> 0
c    (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0 ∧ -p_345) -> (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧ -b^{1, 346}_0)
c  in CNF:
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_2
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_1
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_0
c  in DIMACS:
 2195  2196 -2197  345 -2198 0
 2195  2196 -2197  345 -2199 0
 2195  2196 -2197  345 -2200 0

c  0-1 --> -1
c    (-b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧ -p_345) -> ( b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0)
c  in CNF:
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨  b^{1, 346}_2
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_1
c     b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨  b^{1, 346}_0
c  in DIMACS:
 2195  2196  2197  345  2198 0
 2195  2196  2197  345 -2199 0
 2195  2196  2197  345  2200 0

c  -1-1 --> -2
c    ( b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧  b^{1, 345}_0 ∧ -p_345) -> ( b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0)
c  in CNF:
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨  b^{1, 346}_2
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨  b^{1, 346}_1
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨  p_345 ∨ -b^{1, 346}_0
c  in DIMACS:
-2195  2196 -2197  345  2198 0
-2195  2196 -2197  345  2199 0
-2195  2196 -2197  345 -2200 0

c  -2-1 --> break 
c    ( b^{1, 345}_2 ∧  b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨  b^{1, 345}_0 ∨  p_345 ∨ break
c  in DIMACS:
-2195 -2196  2197  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 345}_2 ∧ -b^{1, 345}_1 ∧ -b^{1, 345}_0 ∧ true) 
c  in CNF:
c    -b^{1, 345}_2 ∨  b^{1, 345}_1 ∨  b^{1, 345}_0 ∨ false 
c  in DIMACS:
-2195  2196  2197  0

c  3 does not represent an automaton state.
c    -(-b^{1, 345}_2 ∧  b^{1, 345}_1 ∧  b^{1, 345}_0 ∧ true) 
c  in CNF:
c     b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ false 
c  in DIMACS:
 2195 -2196 -2197  0
c  -3 does not represent an automaton state.
c    -( b^{1, 345}_2 ∧  b^{1, 345}_1 ∧  b^{1, 345}_0 ∧ true) 
c  in CNF:
c    -b^{1, 345}_2 ∨ -b^{1, 345}_1 ∨ -b^{1, 345}_0 ∨ false 
c  in DIMACS:
-2195 -2196 -2197  0

c i = 346
c  -2+1 --> -1
c    ( b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧  p_346) -> ( b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0)
c  in CNF:
c    -b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨  b^{1, 347}_2
c    -b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_1
c    -b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨  b^{1, 347}_0
c  in DIMACS:
-2198 -2199  2200 -346  2201 0
-2198 -2199  2200 -346 -2202 0
-2198 -2199  2200 -346  2203 0

c  -1+1 --> 0
c    ( b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0 ∧  p_346) -> (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧ -b^{1, 347}_0)
c  in CNF:
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_2
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_1
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_0
c  in DIMACS:
-2198  2199 -2200 -346 -2201 0
-2198  2199 -2200 -346 -2202 0
-2198  2199 -2200 -346 -2203 0

c  0+1 --> 1
c    (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧  p_346) -> (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0)
c  in CNF:
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_2
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_1
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨  b^{1, 347}_0
c  in DIMACS:
 2198  2199  2200 -346 -2201 0
 2198  2199  2200 -346 -2202 0
 2198  2199  2200 -346  2203 0

c  1+1 --> 2
c    (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0 ∧  p_346) -> (-b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0)
c  in CNF:
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_2
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨  b^{1, 347}_1
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ -p_346 ∨ -b^{1, 347}_0
c  in DIMACS:
 2198  2199 -2200 -346 -2201 0
 2198  2199 -2200 -346  2202 0
 2198  2199 -2200 -346 -2203 0

c  2+1 --> break 
c    (-b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧  p_346) -> break
c  in CNF:
c     b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ -p_346 ∨ break
c  in DIMACS:
 2198 -2199  2200 -346 1162 0


c  2-1 --> 1
c    (-b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧ -p_346) -> (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0)
c  in CNF:
c     b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_2
c     b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_1
c     b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨  b^{1, 347}_0
c  in DIMACS:
 2198 -2199  2200  346 -2201 0
 2198 -2199  2200  346 -2202 0
 2198 -2199  2200  346  2203 0

c  1-1 --> 0
c    (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0 ∧ -p_346) -> (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧ -b^{1, 347}_0)
c  in CNF:
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_2
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_1
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_0
c  in DIMACS:
 2198  2199 -2200  346 -2201 0
 2198  2199 -2200  346 -2202 0
 2198  2199 -2200  346 -2203 0

c  0-1 --> -1
c    (-b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧ -p_346) -> ( b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0)
c  in CNF:
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨  b^{1, 347}_2
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_1
c     b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨  b^{1, 347}_0
c  in DIMACS:
 2198  2199  2200  346  2201 0
 2198  2199  2200  346 -2202 0
 2198  2199  2200  346  2203 0

c  -1-1 --> -2
c    ( b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧  b^{1, 346}_0 ∧ -p_346) -> ( b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0)
c  in CNF:
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨  b^{1, 347}_2
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨  b^{1, 347}_1
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨  p_346 ∨ -b^{1, 347}_0
c  in DIMACS:
-2198  2199 -2200  346  2201 0
-2198  2199 -2200  346  2202 0
-2198  2199 -2200  346 -2203 0

c  -2-1 --> break 
c    ( b^{1, 346}_2 ∧  b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧ -p_346) -> break
c  in CNF:
c    -b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨  b^{1, 346}_0 ∨  p_346 ∨ break
c  in DIMACS:
-2198 -2199  2200  346 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 346}_2 ∧ -b^{1, 346}_1 ∧ -b^{1, 346}_0 ∧ true) 
c  in CNF:
c    -b^{1, 346}_2 ∨  b^{1, 346}_1 ∨  b^{1, 346}_0 ∨ false 
c  in DIMACS:
-2198  2199  2200  0

c  3 does not represent an automaton state.
c    -(-b^{1, 346}_2 ∧  b^{1, 346}_1 ∧  b^{1, 346}_0 ∧ true) 
c  in CNF:
c     b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ false 
c  in DIMACS:
 2198 -2199 -2200  0
c  -3 does not represent an automaton state.
c    -( b^{1, 346}_2 ∧  b^{1, 346}_1 ∧  b^{1, 346}_0 ∧ true) 
c  in CNF:
c    -b^{1, 346}_2 ∨ -b^{1, 346}_1 ∨ -b^{1, 346}_0 ∨ false 
c  in DIMACS:
-2198 -2199 -2200  0

c i = 347
c  -2+1 --> -1
c    ( b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧  p_347) -> ( b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0)
c  in CNF:
c    -b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨  b^{1, 348}_2
c    -b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_1
c    -b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨  b^{1, 348}_0
c  in DIMACS:
-2201 -2202  2203 -347  2204 0
-2201 -2202  2203 -347 -2205 0
-2201 -2202  2203 -347  2206 0

c  -1+1 --> 0
c    ( b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0 ∧  p_347) -> (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧ -b^{1, 348}_0)
c  in CNF:
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_2
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_1
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_0
c  in DIMACS:
-2201  2202 -2203 -347 -2204 0
-2201  2202 -2203 -347 -2205 0
-2201  2202 -2203 -347 -2206 0

c  0+1 --> 1
c    (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧  p_347) -> (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0)
c  in CNF:
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_2
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_1
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨  b^{1, 348}_0
c  in DIMACS:
 2201  2202  2203 -347 -2204 0
 2201  2202  2203 -347 -2205 0
 2201  2202  2203 -347  2206 0

c  1+1 --> 2
c    (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0 ∧  p_347) -> (-b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0)
c  in CNF:
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_2
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨  b^{1, 348}_1
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ -p_347 ∨ -b^{1, 348}_0
c  in DIMACS:
 2201  2202 -2203 -347 -2204 0
 2201  2202 -2203 -347  2205 0
 2201  2202 -2203 -347 -2206 0

c  2+1 --> break 
c    (-b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧  p_347) -> break
c  in CNF:
c     b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ -p_347 ∨ break
c  in DIMACS:
 2201 -2202  2203 -347 1162 0


c  2-1 --> 1
c    (-b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧ -p_347) -> (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0)
c  in CNF:
c     b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_2
c     b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_1
c     b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨  b^{1, 348}_0
c  in DIMACS:
 2201 -2202  2203  347 -2204 0
 2201 -2202  2203  347 -2205 0
 2201 -2202  2203  347  2206 0

c  1-1 --> 0
c    (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0 ∧ -p_347) -> (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧ -b^{1, 348}_0)
c  in CNF:
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_2
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_1
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_0
c  in DIMACS:
 2201  2202 -2203  347 -2204 0
 2201  2202 -2203  347 -2205 0
 2201  2202 -2203  347 -2206 0

c  0-1 --> -1
c    (-b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧ -p_347) -> ( b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0)
c  in CNF:
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨  b^{1, 348}_2
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_1
c     b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨  b^{1, 348}_0
c  in DIMACS:
 2201  2202  2203  347  2204 0
 2201  2202  2203  347 -2205 0
 2201  2202  2203  347  2206 0

c  -1-1 --> -2
c    ( b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧  b^{1, 347}_0 ∧ -p_347) -> ( b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0)
c  in CNF:
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨  b^{1, 348}_2
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨  b^{1, 348}_1
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨  p_347 ∨ -b^{1, 348}_0
c  in DIMACS:
-2201  2202 -2203  347  2204 0
-2201  2202 -2203  347  2205 0
-2201  2202 -2203  347 -2206 0

c  -2-1 --> break 
c    ( b^{1, 347}_2 ∧  b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧ -p_347) -> break
c  in CNF:
c    -b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨  b^{1, 347}_0 ∨  p_347 ∨ break
c  in DIMACS:
-2201 -2202  2203  347 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 347}_2 ∧ -b^{1, 347}_1 ∧ -b^{1, 347}_0 ∧ true) 
c  in CNF:
c    -b^{1, 347}_2 ∨  b^{1, 347}_1 ∨  b^{1, 347}_0 ∨ false 
c  in DIMACS:
-2201  2202  2203  0

c  3 does not represent an automaton state.
c    -(-b^{1, 347}_2 ∧  b^{1, 347}_1 ∧  b^{1, 347}_0 ∧ true) 
c  in CNF:
c     b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ false 
c  in DIMACS:
 2201 -2202 -2203  0
c  -3 does not represent an automaton state.
c    -( b^{1, 347}_2 ∧  b^{1, 347}_1 ∧  b^{1, 347}_0 ∧ true) 
c  in CNF:
c    -b^{1, 347}_2 ∨ -b^{1, 347}_1 ∨ -b^{1, 347}_0 ∨ false 
c  in DIMACS:
-2201 -2202 -2203  0

c i = 348
c  -2+1 --> -1
c    ( b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧  p_348) -> ( b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0)
c  in CNF:
c    -b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨  b^{1, 349}_2
c    -b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_1
c    -b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨  b^{1, 349}_0
c  in DIMACS:
-2204 -2205  2206 -348  2207 0
-2204 -2205  2206 -348 -2208 0
-2204 -2205  2206 -348  2209 0

c  -1+1 --> 0
c    ( b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0 ∧  p_348) -> (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧ -b^{1, 349}_0)
c  in CNF:
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_2
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_1
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_0
c  in DIMACS:
-2204  2205 -2206 -348 -2207 0
-2204  2205 -2206 -348 -2208 0
-2204  2205 -2206 -348 -2209 0

c  0+1 --> 1
c    (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧  p_348) -> (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0)
c  in CNF:
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_2
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_1
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨  b^{1, 349}_0
c  in DIMACS:
 2204  2205  2206 -348 -2207 0
 2204  2205  2206 -348 -2208 0
 2204  2205  2206 -348  2209 0

c  1+1 --> 2
c    (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0 ∧  p_348) -> (-b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0)
c  in CNF:
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_2
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨  b^{1, 349}_1
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ -p_348 ∨ -b^{1, 349}_0
c  in DIMACS:
 2204  2205 -2206 -348 -2207 0
 2204  2205 -2206 -348  2208 0
 2204  2205 -2206 -348 -2209 0

c  2+1 --> break 
c    (-b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧  p_348) -> break
c  in CNF:
c     b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 2204 -2205  2206 -348 1162 0


c  2-1 --> 1
c    (-b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧ -p_348) -> (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0)
c  in CNF:
c     b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_2
c     b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_1
c     b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨  b^{1, 349}_0
c  in DIMACS:
 2204 -2205  2206  348 -2207 0
 2204 -2205  2206  348 -2208 0
 2204 -2205  2206  348  2209 0

c  1-1 --> 0
c    (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0 ∧ -p_348) -> (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧ -b^{1, 349}_0)
c  in CNF:
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_2
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_1
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_0
c  in DIMACS:
 2204  2205 -2206  348 -2207 0
 2204  2205 -2206  348 -2208 0
 2204  2205 -2206  348 -2209 0

c  0-1 --> -1
c    (-b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧ -p_348) -> ( b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0)
c  in CNF:
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨  b^{1, 349}_2
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_1
c     b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨  b^{1, 349}_0
c  in DIMACS:
 2204  2205  2206  348  2207 0
 2204  2205  2206  348 -2208 0
 2204  2205  2206  348  2209 0

c  -1-1 --> -2
c    ( b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧  b^{1, 348}_0 ∧ -p_348) -> ( b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0)
c  in CNF:
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨  b^{1, 349}_2
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨  b^{1, 349}_1
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨  p_348 ∨ -b^{1, 349}_0
c  in DIMACS:
-2204  2205 -2206  348  2207 0
-2204  2205 -2206  348  2208 0
-2204  2205 -2206  348 -2209 0

c  -2-1 --> break 
c    ( b^{1, 348}_2 ∧  b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨  b^{1, 348}_0 ∨  p_348 ∨ break
c  in DIMACS:
-2204 -2205  2206  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 348}_2 ∧ -b^{1, 348}_1 ∧ -b^{1, 348}_0 ∧ true) 
c  in CNF:
c    -b^{1, 348}_2 ∨  b^{1, 348}_1 ∨  b^{1, 348}_0 ∨ false 
c  in DIMACS:
-2204  2205  2206  0

c  3 does not represent an automaton state.
c    -(-b^{1, 348}_2 ∧  b^{1, 348}_1 ∧  b^{1, 348}_0 ∧ true) 
c  in CNF:
c     b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ false 
c  in DIMACS:
 2204 -2205 -2206  0
c  -3 does not represent an automaton state.
c    -( b^{1, 348}_2 ∧  b^{1, 348}_1 ∧  b^{1, 348}_0 ∧ true) 
c  in CNF:
c    -b^{1, 348}_2 ∨ -b^{1, 348}_1 ∨ -b^{1, 348}_0 ∨ false 
c  in DIMACS:
-2204 -2205 -2206  0

c i = 349
c  -2+1 --> -1
c    ( b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧  p_349) -> ( b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0)
c  in CNF:
c    -b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨  b^{1, 350}_2
c    -b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_1
c    -b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨  b^{1, 350}_0
c  in DIMACS:
-2207 -2208  2209 -349  2210 0
-2207 -2208  2209 -349 -2211 0
-2207 -2208  2209 -349  2212 0

c  -1+1 --> 0
c    ( b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0 ∧  p_349) -> (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧ -b^{1, 350}_0)
c  in CNF:
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_2
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_1
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_0
c  in DIMACS:
-2207  2208 -2209 -349 -2210 0
-2207  2208 -2209 -349 -2211 0
-2207  2208 -2209 -349 -2212 0

c  0+1 --> 1
c    (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧  p_349) -> (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0)
c  in CNF:
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_2
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_1
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨  b^{1, 350}_0
c  in DIMACS:
 2207  2208  2209 -349 -2210 0
 2207  2208  2209 -349 -2211 0
 2207  2208  2209 -349  2212 0

c  1+1 --> 2
c    (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0 ∧  p_349) -> (-b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0)
c  in CNF:
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_2
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨  b^{1, 350}_1
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ -p_349 ∨ -b^{1, 350}_0
c  in DIMACS:
 2207  2208 -2209 -349 -2210 0
 2207  2208 -2209 -349  2211 0
 2207  2208 -2209 -349 -2212 0

c  2+1 --> break 
c    (-b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧  p_349) -> break
c  in CNF:
c     b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ -p_349 ∨ break
c  in DIMACS:
 2207 -2208  2209 -349 1162 0


c  2-1 --> 1
c    (-b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧ -p_349) -> (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0)
c  in CNF:
c     b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_2
c     b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_1
c     b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨  b^{1, 350}_0
c  in DIMACS:
 2207 -2208  2209  349 -2210 0
 2207 -2208  2209  349 -2211 0
 2207 -2208  2209  349  2212 0

c  1-1 --> 0
c    (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0 ∧ -p_349) -> (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧ -b^{1, 350}_0)
c  in CNF:
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_2
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_1
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_0
c  in DIMACS:
 2207  2208 -2209  349 -2210 0
 2207  2208 -2209  349 -2211 0
 2207  2208 -2209  349 -2212 0

c  0-1 --> -1
c    (-b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧ -p_349) -> ( b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0)
c  in CNF:
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨  b^{1, 350}_2
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_1
c     b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨  b^{1, 350}_0
c  in DIMACS:
 2207  2208  2209  349  2210 0
 2207  2208  2209  349 -2211 0
 2207  2208  2209  349  2212 0

c  -1-1 --> -2
c    ( b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧  b^{1, 349}_0 ∧ -p_349) -> ( b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0)
c  in CNF:
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨  b^{1, 350}_2
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨  b^{1, 350}_1
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨  p_349 ∨ -b^{1, 350}_0
c  in DIMACS:
-2207  2208 -2209  349  2210 0
-2207  2208 -2209  349  2211 0
-2207  2208 -2209  349 -2212 0

c  -2-1 --> break 
c    ( b^{1, 349}_2 ∧  b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧ -p_349) -> break
c  in CNF:
c    -b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨  b^{1, 349}_0 ∨  p_349 ∨ break
c  in DIMACS:
-2207 -2208  2209  349 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 349}_2 ∧ -b^{1, 349}_1 ∧ -b^{1, 349}_0 ∧ true) 
c  in CNF:
c    -b^{1, 349}_2 ∨  b^{1, 349}_1 ∨  b^{1, 349}_0 ∨ false 
c  in DIMACS:
-2207  2208  2209  0

c  3 does not represent an automaton state.
c    -(-b^{1, 349}_2 ∧  b^{1, 349}_1 ∧  b^{1, 349}_0 ∧ true) 
c  in CNF:
c     b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ false 
c  in DIMACS:
 2207 -2208 -2209  0
c  -3 does not represent an automaton state.
c    -( b^{1, 349}_2 ∧  b^{1, 349}_1 ∧  b^{1, 349}_0 ∧ true) 
c  in CNF:
c    -b^{1, 349}_2 ∨ -b^{1, 349}_1 ∨ -b^{1, 349}_0 ∨ false 
c  in DIMACS:
-2207 -2208 -2209  0

c i = 350
c  -2+1 --> -1
c    ( b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧  p_350) -> ( b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0)
c  in CNF:
c    -b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨  b^{1, 351}_2
c    -b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_1
c    -b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨  b^{1, 351}_0
c  in DIMACS:
-2210 -2211  2212 -350  2213 0
-2210 -2211  2212 -350 -2214 0
-2210 -2211  2212 -350  2215 0

c  -1+1 --> 0
c    ( b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0 ∧  p_350) -> (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧ -b^{1, 351}_0)
c  in CNF:
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_2
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_1
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_0
c  in DIMACS:
-2210  2211 -2212 -350 -2213 0
-2210  2211 -2212 -350 -2214 0
-2210  2211 -2212 -350 -2215 0

c  0+1 --> 1
c    (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧  p_350) -> (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0)
c  in CNF:
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_2
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_1
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨  b^{1, 351}_0
c  in DIMACS:
 2210  2211  2212 -350 -2213 0
 2210  2211  2212 -350 -2214 0
 2210  2211  2212 -350  2215 0

c  1+1 --> 2
c    (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0 ∧  p_350) -> (-b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0)
c  in CNF:
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_2
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨  b^{1, 351}_1
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ -p_350 ∨ -b^{1, 351}_0
c  in DIMACS:
 2210  2211 -2212 -350 -2213 0
 2210  2211 -2212 -350  2214 0
 2210  2211 -2212 -350 -2215 0

c  2+1 --> break 
c    (-b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧  p_350) -> break
c  in CNF:
c     b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 2210 -2211  2212 -350 1162 0


c  2-1 --> 1
c    (-b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧ -p_350) -> (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0)
c  in CNF:
c     b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_2
c     b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_1
c     b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨  b^{1, 351}_0
c  in DIMACS:
 2210 -2211  2212  350 -2213 0
 2210 -2211  2212  350 -2214 0
 2210 -2211  2212  350  2215 0

c  1-1 --> 0
c    (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0 ∧ -p_350) -> (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧ -b^{1, 351}_0)
c  in CNF:
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_2
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_1
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_0
c  in DIMACS:
 2210  2211 -2212  350 -2213 0
 2210  2211 -2212  350 -2214 0
 2210  2211 -2212  350 -2215 0

c  0-1 --> -1
c    (-b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧ -p_350) -> ( b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0)
c  in CNF:
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨  b^{1, 351}_2
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_1
c     b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨  b^{1, 351}_0
c  in DIMACS:
 2210  2211  2212  350  2213 0
 2210  2211  2212  350 -2214 0
 2210  2211  2212  350  2215 0

c  -1-1 --> -2
c    ( b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧  b^{1, 350}_0 ∧ -p_350) -> ( b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0)
c  in CNF:
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨  b^{1, 351}_2
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨  b^{1, 351}_1
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨  p_350 ∨ -b^{1, 351}_0
c  in DIMACS:
-2210  2211 -2212  350  2213 0
-2210  2211 -2212  350  2214 0
-2210  2211 -2212  350 -2215 0

c  -2-1 --> break 
c    ( b^{1, 350}_2 ∧  b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨  b^{1, 350}_0 ∨  p_350 ∨ break
c  in DIMACS:
-2210 -2211  2212  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 350}_2 ∧ -b^{1, 350}_1 ∧ -b^{1, 350}_0 ∧ true) 
c  in CNF:
c    -b^{1, 350}_2 ∨  b^{1, 350}_1 ∨  b^{1, 350}_0 ∨ false 
c  in DIMACS:
-2210  2211  2212  0

c  3 does not represent an automaton state.
c    -(-b^{1, 350}_2 ∧  b^{1, 350}_1 ∧  b^{1, 350}_0 ∧ true) 
c  in CNF:
c     b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ false 
c  in DIMACS:
 2210 -2211 -2212  0
c  -3 does not represent an automaton state.
c    -( b^{1, 350}_2 ∧  b^{1, 350}_1 ∧  b^{1, 350}_0 ∧ true) 
c  in CNF:
c    -b^{1, 350}_2 ∨ -b^{1, 350}_1 ∨ -b^{1, 350}_0 ∨ false 
c  in DIMACS:
-2210 -2211 -2212  0

c i = 351
c  -2+1 --> -1
c    ( b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧  p_351) -> ( b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0)
c  in CNF:
c    -b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨  b^{1, 352}_2
c    -b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_1
c    -b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨  b^{1, 352}_0
c  in DIMACS:
-2213 -2214  2215 -351  2216 0
-2213 -2214  2215 -351 -2217 0
-2213 -2214  2215 -351  2218 0

c  -1+1 --> 0
c    ( b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0 ∧  p_351) -> (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧ -b^{1, 352}_0)
c  in CNF:
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_2
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_1
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_0
c  in DIMACS:
-2213  2214 -2215 -351 -2216 0
-2213  2214 -2215 -351 -2217 0
-2213  2214 -2215 -351 -2218 0

c  0+1 --> 1
c    (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧  p_351) -> (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0)
c  in CNF:
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_2
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_1
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨  b^{1, 352}_0
c  in DIMACS:
 2213  2214  2215 -351 -2216 0
 2213  2214  2215 -351 -2217 0
 2213  2214  2215 -351  2218 0

c  1+1 --> 2
c    (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0 ∧  p_351) -> (-b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0)
c  in CNF:
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_2
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨  b^{1, 352}_1
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ -p_351 ∨ -b^{1, 352}_0
c  in DIMACS:
 2213  2214 -2215 -351 -2216 0
 2213  2214 -2215 -351  2217 0
 2213  2214 -2215 -351 -2218 0

c  2+1 --> break 
c    (-b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧  p_351) -> break
c  in CNF:
c     b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 2213 -2214  2215 -351 1162 0


c  2-1 --> 1
c    (-b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧ -p_351) -> (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0)
c  in CNF:
c     b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_2
c     b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_1
c     b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨  b^{1, 352}_0
c  in DIMACS:
 2213 -2214  2215  351 -2216 0
 2213 -2214  2215  351 -2217 0
 2213 -2214  2215  351  2218 0

c  1-1 --> 0
c    (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0 ∧ -p_351) -> (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧ -b^{1, 352}_0)
c  in CNF:
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_2
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_1
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_0
c  in DIMACS:
 2213  2214 -2215  351 -2216 0
 2213  2214 -2215  351 -2217 0
 2213  2214 -2215  351 -2218 0

c  0-1 --> -1
c    (-b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧ -p_351) -> ( b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0)
c  in CNF:
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨  b^{1, 352}_2
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_1
c     b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨  b^{1, 352}_0
c  in DIMACS:
 2213  2214  2215  351  2216 0
 2213  2214  2215  351 -2217 0
 2213  2214  2215  351  2218 0

c  -1-1 --> -2
c    ( b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧  b^{1, 351}_0 ∧ -p_351) -> ( b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0)
c  in CNF:
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨  b^{1, 352}_2
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨  b^{1, 352}_1
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨  p_351 ∨ -b^{1, 352}_0
c  in DIMACS:
-2213  2214 -2215  351  2216 0
-2213  2214 -2215  351  2217 0
-2213  2214 -2215  351 -2218 0

c  -2-1 --> break 
c    ( b^{1, 351}_2 ∧  b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨  b^{1, 351}_0 ∨  p_351 ∨ break
c  in DIMACS:
-2213 -2214  2215  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 351}_2 ∧ -b^{1, 351}_1 ∧ -b^{1, 351}_0 ∧ true) 
c  in CNF:
c    -b^{1, 351}_2 ∨  b^{1, 351}_1 ∨  b^{1, 351}_0 ∨ false 
c  in DIMACS:
-2213  2214  2215  0

c  3 does not represent an automaton state.
c    -(-b^{1, 351}_2 ∧  b^{1, 351}_1 ∧  b^{1, 351}_0 ∧ true) 
c  in CNF:
c     b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ false 
c  in DIMACS:
 2213 -2214 -2215  0
c  -3 does not represent an automaton state.
c    -( b^{1, 351}_2 ∧  b^{1, 351}_1 ∧  b^{1, 351}_0 ∧ true) 
c  in CNF:
c    -b^{1, 351}_2 ∨ -b^{1, 351}_1 ∨ -b^{1, 351}_0 ∨ false 
c  in DIMACS:
-2213 -2214 -2215  0

c i = 352
c  -2+1 --> -1
c    ( b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧  p_352) -> ( b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0)
c  in CNF:
c    -b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨  b^{1, 353}_2
c    -b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_1
c    -b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨  b^{1, 353}_0
c  in DIMACS:
-2216 -2217  2218 -352  2219 0
-2216 -2217  2218 -352 -2220 0
-2216 -2217  2218 -352  2221 0

c  -1+1 --> 0
c    ( b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0 ∧  p_352) -> (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧ -b^{1, 353}_0)
c  in CNF:
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_2
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_1
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_0
c  in DIMACS:
-2216  2217 -2218 -352 -2219 0
-2216  2217 -2218 -352 -2220 0
-2216  2217 -2218 -352 -2221 0

c  0+1 --> 1
c    (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧  p_352) -> (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0)
c  in CNF:
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_2
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_1
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨  b^{1, 353}_0
c  in DIMACS:
 2216  2217  2218 -352 -2219 0
 2216  2217  2218 -352 -2220 0
 2216  2217  2218 -352  2221 0

c  1+1 --> 2
c    (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0 ∧  p_352) -> (-b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0)
c  in CNF:
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_2
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨  b^{1, 353}_1
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ -p_352 ∨ -b^{1, 353}_0
c  in DIMACS:
 2216  2217 -2218 -352 -2219 0
 2216  2217 -2218 -352  2220 0
 2216  2217 -2218 -352 -2221 0

c  2+1 --> break 
c    (-b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧  p_352) -> break
c  in CNF:
c     b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 2216 -2217  2218 -352 1162 0


c  2-1 --> 1
c    (-b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧ -p_352) -> (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0)
c  in CNF:
c     b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_2
c     b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_1
c     b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨  b^{1, 353}_0
c  in DIMACS:
 2216 -2217  2218  352 -2219 0
 2216 -2217  2218  352 -2220 0
 2216 -2217  2218  352  2221 0

c  1-1 --> 0
c    (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0 ∧ -p_352) -> (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧ -b^{1, 353}_0)
c  in CNF:
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_2
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_1
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_0
c  in DIMACS:
 2216  2217 -2218  352 -2219 0
 2216  2217 -2218  352 -2220 0
 2216  2217 -2218  352 -2221 0

c  0-1 --> -1
c    (-b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧ -p_352) -> ( b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0)
c  in CNF:
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨  b^{1, 353}_2
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_1
c     b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨  b^{1, 353}_0
c  in DIMACS:
 2216  2217  2218  352  2219 0
 2216  2217  2218  352 -2220 0
 2216  2217  2218  352  2221 0

c  -1-1 --> -2
c    ( b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧  b^{1, 352}_0 ∧ -p_352) -> ( b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0)
c  in CNF:
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨  b^{1, 353}_2
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨  b^{1, 353}_1
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨  p_352 ∨ -b^{1, 353}_0
c  in DIMACS:
-2216  2217 -2218  352  2219 0
-2216  2217 -2218  352  2220 0
-2216  2217 -2218  352 -2221 0

c  -2-1 --> break 
c    ( b^{1, 352}_2 ∧  b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨  b^{1, 352}_0 ∨  p_352 ∨ break
c  in DIMACS:
-2216 -2217  2218  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 352}_2 ∧ -b^{1, 352}_1 ∧ -b^{1, 352}_0 ∧ true) 
c  in CNF:
c    -b^{1, 352}_2 ∨  b^{1, 352}_1 ∨  b^{1, 352}_0 ∨ false 
c  in DIMACS:
-2216  2217  2218  0

c  3 does not represent an automaton state.
c    -(-b^{1, 352}_2 ∧  b^{1, 352}_1 ∧  b^{1, 352}_0 ∧ true) 
c  in CNF:
c     b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ false 
c  in DIMACS:
 2216 -2217 -2218  0
c  -3 does not represent an automaton state.
c    -( b^{1, 352}_2 ∧  b^{1, 352}_1 ∧  b^{1, 352}_0 ∧ true) 
c  in CNF:
c    -b^{1, 352}_2 ∨ -b^{1, 352}_1 ∨ -b^{1, 352}_0 ∨ false 
c  in DIMACS:
-2216 -2217 -2218  0

c i = 353
c  -2+1 --> -1
c    ( b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧  p_353) -> ( b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0)
c  in CNF:
c    -b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨  b^{1, 354}_2
c    -b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_1
c    -b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨  b^{1, 354}_0
c  in DIMACS:
-2219 -2220  2221 -353  2222 0
-2219 -2220  2221 -353 -2223 0
-2219 -2220  2221 -353  2224 0

c  -1+1 --> 0
c    ( b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0 ∧  p_353) -> (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧ -b^{1, 354}_0)
c  in CNF:
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_2
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_1
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_0
c  in DIMACS:
-2219  2220 -2221 -353 -2222 0
-2219  2220 -2221 -353 -2223 0
-2219  2220 -2221 -353 -2224 0

c  0+1 --> 1
c    (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧  p_353) -> (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0)
c  in CNF:
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_2
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_1
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨  b^{1, 354}_0
c  in DIMACS:
 2219  2220  2221 -353 -2222 0
 2219  2220  2221 -353 -2223 0
 2219  2220  2221 -353  2224 0

c  1+1 --> 2
c    (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0 ∧  p_353) -> (-b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0)
c  in CNF:
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_2
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨  b^{1, 354}_1
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ -p_353 ∨ -b^{1, 354}_0
c  in DIMACS:
 2219  2220 -2221 -353 -2222 0
 2219  2220 -2221 -353  2223 0
 2219  2220 -2221 -353 -2224 0

c  2+1 --> break 
c    (-b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧  p_353) -> break
c  in CNF:
c     b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ -p_353 ∨ break
c  in DIMACS:
 2219 -2220  2221 -353 1162 0


c  2-1 --> 1
c    (-b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧ -p_353) -> (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0)
c  in CNF:
c     b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_2
c     b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_1
c     b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨  b^{1, 354}_0
c  in DIMACS:
 2219 -2220  2221  353 -2222 0
 2219 -2220  2221  353 -2223 0
 2219 -2220  2221  353  2224 0

c  1-1 --> 0
c    (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0 ∧ -p_353) -> (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧ -b^{1, 354}_0)
c  in CNF:
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_2
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_1
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_0
c  in DIMACS:
 2219  2220 -2221  353 -2222 0
 2219  2220 -2221  353 -2223 0
 2219  2220 -2221  353 -2224 0

c  0-1 --> -1
c    (-b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧ -p_353) -> ( b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0)
c  in CNF:
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨  b^{1, 354}_2
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_1
c     b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨  b^{1, 354}_0
c  in DIMACS:
 2219  2220  2221  353  2222 0
 2219  2220  2221  353 -2223 0
 2219  2220  2221  353  2224 0

c  -1-1 --> -2
c    ( b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧  b^{1, 353}_0 ∧ -p_353) -> ( b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0)
c  in CNF:
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨  b^{1, 354}_2
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨  b^{1, 354}_1
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨  p_353 ∨ -b^{1, 354}_0
c  in DIMACS:
-2219  2220 -2221  353  2222 0
-2219  2220 -2221  353  2223 0
-2219  2220 -2221  353 -2224 0

c  -2-1 --> break 
c    ( b^{1, 353}_2 ∧  b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧ -p_353) -> break
c  in CNF:
c    -b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨  b^{1, 353}_0 ∨  p_353 ∨ break
c  in DIMACS:
-2219 -2220  2221  353 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 353}_2 ∧ -b^{1, 353}_1 ∧ -b^{1, 353}_0 ∧ true) 
c  in CNF:
c    -b^{1, 353}_2 ∨  b^{1, 353}_1 ∨  b^{1, 353}_0 ∨ false 
c  in DIMACS:
-2219  2220  2221  0

c  3 does not represent an automaton state.
c    -(-b^{1, 353}_2 ∧  b^{1, 353}_1 ∧  b^{1, 353}_0 ∧ true) 
c  in CNF:
c     b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ false 
c  in DIMACS:
 2219 -2220 -2221  0
c  -3 does not represent an automaton state.
c    -( b^{1, 353}_2 ∧  b^{1, 353}_1 ∧  b^{1, 353}_0 ∧ true) 
c  in CNF:
c    -b^{1, 353}_2 ∨ -b^{1, 353}_1 ∨ -b^{1, 353}_0 ∨ false 
c  in DIMACS:
-2219 -2220 -2221  0

c i = 354
c  -2+1 --> -1
c    ( b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧  p_354) -> ( b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0)
c  in CNF:
c    -b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨  b^{1, 355}_2
c    -b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_1
c    -b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨  b^{1, 355}_0
c  in DIMACS:
-2222 -2223  2224 -354  2225 0
-2222 -2223  2224 -354 -2226 0
-2222 -2223  2224 -354  2227 0

c  -1+1 --> 0
c    ( b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0 ∧  p_354) -> (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧ -b^{1, 355}_0)
c  in CNF:
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_2
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_1
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_0
c  in DIMACS:
-2222  2223 -2224 -354 -2225 0
-2222  2223 -2224 -354 -2226 0
-2222  2223 -2224 -354 -2227 0

c  0+1 --> 1
c    (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧  p_354) -> (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0)
c  in CNF:
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_2
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_1
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨  b^{1, 355}_0
c  in DIMACS:
 2222  2223  2224 -354 -2225 0
 2222  2223  2224 -354 -2226 0
 2222  2223  2224 -354  2227 0

c  1+1 --> 2
c    (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0 ∧  p_354) -> (-b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0)
c  in CNF:
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_2
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨  b^{1, 355}_1
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ -p_354 ∨ -b^{1, 355}_0
c  in DIMACS:
 2222  2223 -2224 -354 -2225 0
 2222  2223 -2224 -354  2226 0
 2222  2223 -2224 -354 -2227 0

c  2+1 --> break 
c    (-b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧  p_354) -> break
c  in CNF:
c     b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 2222 -2223  2224 -354 1162 0


c  2-1 --> 1
c    (-b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧ -p_354) -> (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0)
c  in CNF:
c     b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_2
c     b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_1
c     b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨  b^{1, 355}_0
c  in DIMACS:
 2222 -2223  2224  354 -2225 0
 2222 -2223  2224  354 -2226 0
 2222 -2223  2224  354  2227 0

c  1-1 --> 0
c    (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0 ∧ -p_354) -> (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧ -b^{1, 355}_0)
c  in CNF:
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_2
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_1
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_0
c  in DIMACS:
 2222  2223 -2224  354 -2225 0
 2222  2223 -2224  354 -2226 0
 2222  2223 -2224  354 -2227 0

c  0-1 --> -1
c    (-b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧ -p_354) -> ( b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0)
c  in CNF:
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨  b^{1, 355}_2
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_1
c     b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨  b^{1, 355}_0
c  in DIMACS:
 2222  2223  2224  354  2225 0
 2222  2223  2224  354 -2226 0
 2222  2223  2224  354  2227 0

c  -1-1 --> -2
c    ( b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧  b^{1, 354}_0 ∧ -p_354) -> ( b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0)
c  in CNF:
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨  b^{1, 355}_2
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨  b^{1, 355}_1
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨  p_354 ∨ -b^{1, 355}_0
c  in DIMACS:
-2222  2223 -2224  354  2225 0
-2222  2223 -2224  354  2226 0
-2222  2223 -2224  354 -2227 0

c  -2-1 --> break 
c    ( b^{1, 354}_2 ∧  b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨  b^{1, 354}_0 ∨  p_354 ∨ break
c  in DIMACS:
-2222 -2223  2224  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 354}_2 ∧ -b^{1, 354}_1 ∧ -b^{1, 354}_0 ∧ true) 
c  in CNF:
c    -b^{1, 354}_2 ∨  b^{1, 354}_1 ∨  b^{1, 354}_0 ∨ false 
c  in DIMACS:
-2222  2223  2224  0

c  3 does not represent an automaton state.
c    -(-b^{1, 354}_2 ∧  b^{1, 354}_1 ∧  b^{1, 354}_0 ∧ true) 
c  in CNF:
c     b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ false 
c  in DIMACS:
 2222 -2223 -2224  0
c  -3 does not represent an automaton state.
c    -( b^{1, 354}_2 ∧  b^{1, 354}_1 ∧  b^{1, 354}_0 ∧ true) 
c  in CNF:
c    -b^{1, 354}_2 ∨ -b^{1, 354}_1 ∨ -b^{1, 354}_0 ∨ false 
c  in DIMACS:
-2222 -2223 -2224  0

c i = 355
c  -2+1 --> -1
c    ( b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧  p_355) -> ( b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0)
c  in CNF:
c    -b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨  b^{1, 356}_2
c    -b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_1
c    -b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨  b^{1, 356}_0
c  in DIMACS:
-2225 -2226  2227 -355  2228 0
-2225 -2226  2227 -355 -2229 0
-2225 -2226  2227 -355  2230 0

c  -1+1 --> 0
c    ( b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0 ∧  p_355) -> (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧ -b^{1, 356}_0)
c  in CNF:
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_2
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_1
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_0
c  in DIMACS:
-2225  2226 -2227 -355 -2228 0
-2225  2226 -2227 -355 -2229 0
-2225  2226 -2227 -355 -2230 0

c  0+1 --> 1
c    (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧  p_355) -> (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0)
c  in CNF:
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_2
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_1
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨  b^{1, 356}_0
c  in DIMACS:
 2225  2226  2227 -355 -2228 0
 2225  2226  2227 -355 -2229 0
 2225  2226  2227 -355  2230 0

c  1+1 --> 2
c    (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0 ∧  p_355) -> (-b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0)
c  in CNF:
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_2
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨  b^{1, 356}_1
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ -p_355 ∨ -b^{1, 356}_0
c  in DIMACS:
 2225  2226 -2227 -355 -2228 0
 2225  2226 -2227 -355  2229 0
 2225  2226 -2227 -355 -2230 0

c  2+1 --> break 
c    (-b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧  p_355) -> break
c  in CNF:
c     b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ -p_355 ∨ break
c  in DIMACS:
 2225 -2226  2227 -355 1162 0


c  2-1 --> 1
c    (-b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧ -p_355) -> (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0)
c  in CNF:
c     b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_2
c     b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_1
c     b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨  b^{1, 356}_0
c  in DIMACS:
 2225 -2226  2227  355 -2228 0
 2225 -2226  2227  355 -2229 0
 2225 -2226  2227  355  2230 0

c  1-1 --> 0
c    (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0 ∧ -p_355) -> (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧ -b^{1, 356}_0)
c  in CNF:
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_2
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_1
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_0
c  in DIMACS:
 2225  2226 -2227  355 -2228 0
 2225  2226 -2227  355 -2229 0
 2225  2226 -2227  355 -2230 0

c  0-1 --> -1
c    (-b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧ -p_355) -> ( b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0)
c  in CNF:
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨  b^{1, 356}_2
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_1
c     b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨  b^{1, 356}_0
c  in DIMACS:
 2225  2226  2227  355  2228 0
 2225  2226  2227  355 -2229 0
 2225  2226  2227  355  2230 0

c  -1-1 --> -2
c    ( b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧  b^{1, 355}_0 ∧ -p_355) -> ( b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0)
c  in CNF:
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨  b^{1, 356}_2
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨  b^{1, 356}_1
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨  p_355 ∨ -b^{1, 356}_0
c  in DIMACS:
-2225  2226 -2227  355  2228 0
-2225  2226 -2227  355  2229 0
-2225  2226 -2227  355 -2230 0

c  -2-1 --> break 
c    ( b^{1, 355}_2 ∧  b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧ -p_355) -> break
c  in CNF:
c    -b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨  b^{1, 355}_0 ∨  p_355 ∨ break
c  in DIMACS:
-2225 -2226  2227  355 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 355}_2 ∧ -b^{1, 355}_1 ∧ -b^{1, 355}_0 ∧ true) 
c  in CNF:
c    -b^{1, 355}_2 ∨  b^{1, 355}_1 ∨  b^{1, 355}_0 ∨ false 
c  in DIMACS:
-2225  2226  2227  0

c  3 does not represent an automaton state.
c    -(-b^{1, 355}_2 ∧  b^{1, 355}_1 ∧  b^{1, 355}_0 ∧ true) 
c  in CNF:
c     b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ false 
c  in DIMACS:
 2225 -2226 -2227  0
c  -3 does not represent an automaton state.
c    -( b^{1, 355}_2 ∧  b^{1, 355}_1 ∧  b^{1, 355}_0 ∧ true) 
c  in CNF:
c    -b^{1, 355}_2 ∨ -b^{1, 355}_1 ∨ -b^{1, 355}_0 ∨ false 
c  in DIMACS:
-2225 -2226 -2227  0

c i = 356
c  -2+1 --> -1
c    ( b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧  p_356) -> ( b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0)
c  in CNF:
c    -b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨  b^{1, 357}_2
c    -b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_1
c    -b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨  b^{1, 357}_0
c  in DIMACS:
-2228 -2229  2230 -356  2231 0
-2228 -2229  2230 -356 -2232 0
-2228 -2229  2230 -356  2233 0

c  -1+1 --> 0
c    ( b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0 ∧  p_356) -> (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧ -b^{1, 357}_0)
c  in CNF:
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_2
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_1
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_0
c  in DIMACS:
-2228  2229 -2230 -356 -2231 0
-2228  2229 -2230 -356 -2232 0
-2228  2229 -2230 -356 -2233 0

c  0+1 --> 1
c    (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧  p_356) -> (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0)
c  in CNF:
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_2
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_1
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨  b^{1, 357}_0
c  in DIMACS:
 2228  2229  2230 -356 -2231 0
 2228  2229  2230 -356 -2232 0
 2228  2229  2230 -356  2233 0

c  1+1 --> 2
c    (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0 ∧  p_356) -> (-b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0)
c  in CNF:
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_2
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨  b^{1, 357}_1
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ -p_356 ∨ -b^{1, 357}_0
c  in DIMACS:
 2228  2229 -2230 -356 -2231 0
 2228  2229 -2230 -356  2232 0
 2228  2229 -2230 -356 -2233 0

c  2+1 --> break 
c    (-b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧  p_356) -> break
c  in CNF:
c     b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 2228 -2229  2230 -356 1162 0


c  2-1 --> 1
c    (-b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧ -p_356) -> (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0)
c  in CNF:
c     b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_2
c     b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_1
c     b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨  b^{1, 357}_0
c  in DIMACS:
 2228 -2229  2230  356 -2231 0
 2228 -2229  2230  356 -2232 0
 2228 -2229  2230  356  2233 0

c  1-1 --> 0
c    (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0 ∧ -p_356) -> (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧ -b^{1, 357}_0)
c  in CNF:
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_2
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_1
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_0
c  in DIMACS:
 2228  2229 -2230  356 -2231 0
 2228  2229 -2230  356 -2232 0
 2228  2229 -2230  356 -2233 0

c  0-1 --> -1
c    (-b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧ -p_356) -> ( b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0)
c  in CNF:
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨  b^{1, 357}_2
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_1
c     b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨  b^{1, 357}_0
c  in DIMACS:
 2228  2229  2230  356  2231 0
 2228  2229  2230  356 -2232 0
 2228  2229  2230  356  2233 0

c  -1-1 --> -2
c    ( b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧  b^{1, 356}_0 ∧ -p_356) -> ( b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0)
c  in CNF:
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨  b^{1, 357}_2
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨  b^{1, 357}_1
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨  p_356 ∨ -b^{1, 357}_0
c  in DIMACS:
-2228  2229 -2230  356  2231 0
-2228  2229 -2230  356  2232 0
-2228  2229 -2230  356 -2233 0

c  -2-1 --> break 
c    ( b^{1, 356}_2 ∧  b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨  b^{1, 356}_0 ∨  p_356 ∨ break
c  in DIMACS:
-2228 -2229  2230  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 356}_2 ∧ -b^{1, 356}_1 ∧ -b^{1, 356}_0 ∧ true) 
c  in CNF:
c    -b^{1, 356}_2 ∨  b^{1, 356}_1 ∨  b^{1, 356}_0 ∨ false 
c  in DIMACS:
-2228  2229  2230  0

c  3 does not represent an automaton state.
c    -(-b^{1, 356}_2 ∧  b^{1, 356}_1 ∧  b^{1, 356}_0 ∧ true) 
c  in CNF:
c     b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ false 
c  in DIMACS:
 2228 -2229 -2230  0
c  -3 does not represent an automaton state.
c    -( b^{1, 356}_2 ∧  b^{1, 356}_1 ∧  b^{1, 356}_0 ∧ true) 
c  in CNF:
c    -b^{1, 356}_2 ∨ -b^{1, 356}_1 ∨ -b^{1, 356}_0 ∨ false 
c  in DIMACS:
-2228 -2229 -2230  0

c i = 357
c  -2+1 --> -1
c    ( b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧  p_357) -> ( b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0)
c  in CNF:
c    -b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨  b^{1, 358}_2
c    -b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_1
c    -b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨  b^{1, 358}_0
c  in DIMACS:
-2231 -2232  2233 -357  2234 0
-2231 -2232  2233 -357 -2235 0
-2231 -2232  2233 -357  2236 0

c  -1+1 --> 0
c    ( b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0 ∧  p_357) -> (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧ -b^{1, 358}_0)
c  in CNF:
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_2
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_1
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_0
c  in DIMACS:
-2231  2232 -2233 -357 -2234 0
-2231  2232 -2233 -357 -2235 0
-2231  2232 -2233 -357 -2236 0

c  0+1 --> 1
c    (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧  p_357) -> (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0)
c  in CNF:
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_2
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_1
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨  b^{1, 358}_0
c  in DIMACS:
 2231  2232  2233 -357 -2234 0
 2231  2232  2233 -357 -2235 0
 2231  2232  2233 -357  2236 0

c  1+1 --> 2
c    (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0 ∧  p_357) -> (-b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0)
c  in CNF:
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_2
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨  b^{1, 358}_1
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ -p_357 ∨ -b^{1, 358}_0
c  in DIMACS:
 2231  2232 -2233 -357 -2234 0
 2231  2232 -2233 -357  2235 0
 2231  2232 -2233 -357 -2236 0

c  2+1 --> break 
c    (-b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧  p_357) -> break
c  in CNF:
c     b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 2231 -2232  2233 -357 1162 0


c  2-1 --> 1
c    (-b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧ -p_357) -> (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0)
c  in CNF:
c     b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_2
c     b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_1
c     b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨  b^{1, 358}_0
c  in DIMACS:
 2231 -2232  2233  357 -2234 0
 2231 -2232  2233  357 -2235 0
 2231 -2232  2233  357  2236 0

c  1-1 --> 0
c    (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0 ∧ -p_357) -> (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧ -b^{1, 358}_0)
c  in CNF:
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_2
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_1
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_0
c  in DIMACS:
 2231  2232 -2233  357 -2234 0
 2231  2232 -2233  357 -2235 0
 2231  2232 -2233  357 -2236 0

c  0-1 --> -1
c    (-b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧ -p_357) -> ( b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0)
c  in CNF:
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨  b^{1, 358}_2
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_1
c     b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨  b^{1, 358}_0
c  in DIMACS:
 2231  2232  2233  357  2234 0
 2231  2232  2233  357 -2235 0
 2231  2232  2233  357  2236 0

c  -1-1 --> -2
c    ( b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧  b^{1, 357}_0 ∧ -p_357) -> ( b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0)
c  in CNF:
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨  b^{1, 358}_2
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨  b^{1, 358}_1
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨  p_357 ∨ -b^{1, 358}_0
c  in DIMACS:
-2231  2232 -2233  357  2234 0
-2231  2232 -2233  357  2235 0
-2231  2232 -2233  357 -2236 0

c  -2-1 --> break 
c    ( b^{1, 357}_2 ∧  b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨  b^{1, 357}_0 ∨  p_357 ∨ break
c  in DIMACS:
-2231 -2232  2233  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 357}_2 ∧ -b^{1, 357}_1 ∧ -b^{1, 357}_0 ∧ true) 
c  in CNF:
c    -b^{1, 357}_2 ∨  b^{1, 357}_1 ∨  b^{1, 357}_0 ∨ false 
c  in DIMACS:
-2231  2232  2233  0

c  3 does not represent an automaton state.
c    -(-b^{1, 357}_2 ∧  b^{1, 357}_1 ∧  b^{1, 357}_0 ∧ true) 
c  in CNF:
c     b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ false 
c  in DIMACS:
 2231 -2232 -2233  0
c  -3 does not represent an automaton state.
c    -( b^{1, 357}_2 ∧  b^{1, 357}_1 ∧  b^{1, 357}_0 ∧ true) 
c  in CNF:
c    -b^{1, 357}_2 ∨ -b^{1, 357}_1 ∨ -b^{1, 357}_0 ∨ false 
c  in DIMACS:
-2231 -2232 -2233  0

c i = 358
c  -2+1 --> -1
c    ( b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧  p_358) -> ( b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0)
c  in CNF:
c    -b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨  b^{1, 359}_2
c    -b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_1
c    -b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨  b^{1, 359}_0
c  in DIMACS:
-2234 -2235  2236 -358  2237 0
-2234 -2235  2236 -358 -2238 0
-2234 -2235  2236 -358  2239 0

c  -1+1 --> 0
c    ( b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0 ∧  p_358) -> (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧ -b^{1, 359}_0)
c  in CNF:
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_2
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_1
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_0
c  in DIMACS:
-2234  2235 -2236 -358 -2237 0
-2234  2235 -2236 -358 -2238 0
-2234  2235 -2236 -358 -2239 0

c  0+1 --> 1
c    (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧  p_358) -> (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0)
c  in CNF:
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_2
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_1
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨  b^{1, 359}_0
c  in DIMACS:
 2234  2235  2236 -358 -2237 0
 2234  2235  2236 -358 -2238 0
 2234  2235  2236 -358  2239 0

c  1+1 --> 2
c    (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0 ∧  p_358) -> (-b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0)
c  in CNF:
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_2
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨  b^{1, 359}_1
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ -p_358 ∨ -b^{1, 359}_0
c  in DIMACS:
 2234  2235 -2236 -358 -2237 0
 2234  2235 -2236 -358  2238 0
 2234  2235 -2236 -358 -2239 0

c  2+1 --> break 
c    (-b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧  p_358) -> break
c  in CNF:
c     b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ -p_358 ∨ break
c  in DIMACS:
 2234 -2235  2236 -358 1162 0


c  2-1 --> 1
c    (-b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧ -p_358) -> (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0)
c  in CNF:
c     b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_2
c     b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_1
c     b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨  b^{1, 359}_0
c  in DIMACS:
 2234 -2235  2236  358 -2237 0
 2234 -2235  2236  358 -2238 0
 2234 -2235  2236  358  2239 0

c  1-1 --> 0
c    (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0 ∧ -p_358) -> (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧ -b^{1, 359}_0)
c  in CNF:
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_2
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_1
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_0
c  in DIMACS:
 2234  2235 -2236  358 -2237 0
 2234  2235 -2236  358 -2238 0
 2234  2235 -2236  358 -2239 0

c  0-1 --> -1
c    (-b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧ -p_358) -> ( b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0)
c  in CNF:
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨  b^{1, 359}_2
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_1
c     b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨  b^{1, 359}_0
c  in DIMACS:
 2234  2235  2236  358  2237 0
 2234  2235  2236  358 -2238 0
 2234  2235  2236  358  2239 0

c  -1-1 --> -2
c    ( b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧  b^{1, 358}_0 ∧ -p_358) -> ( b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0)
c  in CNF:
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨  b^{1, 359}_2
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨  b^{1, 359}_1
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨  p_358 ∨ -b^{1, 359}_0
c  in DIMACS:
-2234  2235 -2236  358  2237 0
-2234  2235 -2236  358  2238 0
-2234  2235 -2236  358 -2239 0

c  -2-1 --> break 
c    ( b^{1, 358}_2 ∧  b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧ -p_358) -> break
c  in CNF:
c    -b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨  b^{1, 358}_0 ∨  p_358 ∨ break
c  in DIMACS:
-2234 -2235  2236  358 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 358}_2 ∧ -b^{1, 358}_1 ∧ -b^{1, 358}_0 ∧ true) 
c  in CNF:
c    -b^{1, 358}_2 ∨  b^{1, 358}_1 ∨  b^{1, 358}_0 ∨ false 
c  in DIMACS:
-2234  2235  2236  0

c  3 does not represent an automaton state.
c    -(-b^{1, 358}_2 ∧  b^{1, 358}_1 ∧  b^{1, 358}_0 ∧ true) 
c  in CNF:
c     b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ false 
c  in DIMACS:
 2234 -2235 -2236  0
c  -3 does not represent an automaton state.
c    -( b^{1, 358}_2 ∧  b^{1, 358}_1 ∧  b^{1, 358}_0 ∧ true) 
c  in CNF:
c    -b^{1, 358}_2 ∨ -b^{1, 358}_1 ∨ -b^{1, 358}_0 ∨ false 
c  in DIMACS:
-2234 -2235 -2236  0

c i = 359
c  -2+1 --> -1
c    ( b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧  p_359) -> ( b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0)
c  in CNF:
c    -b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨  b^{1, 360}_2
c    -b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_1
c    -b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨  b^{1, 360}_0
c  in DIMACS:
-2237 -2238  2239 -359  2240 0
-2237 -2238  2239 -359 -2241 0
-2237 -2238  2239 -359  2242 0

c  -1+1 --> 0
c    ( b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0 ∧  p_359) -> (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧ -b^{1, 360}_0)
c  in CNF:
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_2
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_1
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_0
c  in DIMACS:
-2237  2238 -2239 -359 -2240 0
-2237  2238 -2239 -359 -2241 0
-2237  2238 -2239 -359 -2242 0

c  0+1 --> 1
c    (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧  p_359) -> (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0)
c  in CNF:
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_2
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_1
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨  b^{1, 360}_0
c  in DIMACS:
 2237  2238  2239 -359 -2240 0
 2237  2238  2239 -359 -2241 0
 2237  2238  2239 -359  2242 0

c  1+1 --> 2
c    (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0 ∧  p_359) -> (-b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0)
c  in CNF:
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_2
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨  b^{1, 360}_1
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ -p_359 ∨ -b^{1, 360}_0
c  in DIMACS:
 2237  2238 -2239 -359 -2240 0
 2237  2238 -2239 -359  2241 0
 2237  2238 -2239 -359 -2242 0

c  2+1 --> break 
c    (-b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧  p_359) -> break
c  in CNF:
c     b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ -p_359 ∨ break
c  in DIMACS:
 2237 -2238  2239 -359 1162 0


c  2-1 --> 1
c    (-b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧ -p_359) -> (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0)
c  in CNF:
c     b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_2
c     b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_1
c     b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨  b^{1, 360}_0
c  in DIMACS:
 2237 -2238  2239  359 -2240 0
 2237 -2238  2239  359 -2241 0
 2237 -2238  2239  359  2242 0

c  1-1 --> 0
c    (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0 ∧ -p_359) -> (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧ -b^{1, 360}_0)
c  in CNF:
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_2
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_1
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_0
c  in DIMACS:
 2237  2238 -2239  359 -2240 0
 2237  2238 -2239  359 -2241 0
 2237  2238 -2239  359 -2242 0

c  0-1 --> -1
c    (-b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧ -p_359) -> ( b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0)
c  in CNF:
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨  b^{1, 360}_2
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_1
c     b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨  b^{1, 360}_0
c  in DIMACS:
 2237  2238  2239  359  2240 0
 2237  2238  2239  359 -2241 0
 2237  2238  2239  359  2242 0

c  -1-1 --> -2
c    ( b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧  b^{1, 359}_0 ∧ -p_359) -> ( b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0)
c  in CNF:
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨  b^{1, 360}_2
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨  b^{1, 360}_1
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨  p_359 ∨ -b^{1, 360}_0
c  in DIMACS:
-2237  2238 -2239  359  2240 0
-2237  2238 -2239  359  2241 0
-2237  2238 -2239  359 -2242 0

c  -2-1 --> break 
c    ( b^{1, 359}_2 ∧  b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧ -p_359) -> break
c  in CNF:
c    -b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨  b^{1, 359}_0 ∨  p_359 ∨ break
c  in DIMACS:
-2237 -2238  2239  359 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 359}_2 ∧ -b^{1, 359}_1 ∧ -b^{1, 359}_0 ∧ true) 
c  in CNF:
c    -b^{1, 359}_2 ∨  b^{1, 359}_1 ∨  b^{1, 359}_0 ∨ false 
c  in DIMACS:
-2237  2238  2239  0

c  3 does not represent an automaton state.
c    -(-b^{1, 359}_2 ∧  b^{1, 359}_1 ∧  b^{1, 359}_0 ∧ true) 
c  in CNF:
c     b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ false 
c  in DIMACS:
 2237 -2238 -2239  0
c  -3 does not represent an automaton state.
c    -( b^{1, 359}_2 ∧  b^{1, 359}_1 ∧  b^{1, 359}_0 ∧ true) 
c  in CNF:
c    -b^{1, 359}_2 ∨ -b^{1, 359}_1 ∨ -b^{1, 359}_0 ∨ false 
c  in DIMACS:
-2237 -2238 -2239  0

c i = 360
c  -2+1 --> -1
c    ( b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧  p_360) -> ( b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0)
c  in CNF:
c    -b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨  b^{1, 361}_2
c    -b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_1
c    -b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨  b^{1, 361}_0
c  in DIMACS:
-2240 -2241  2242 -360  2243 0
-2240 -2241  2242 -360 -2244 0
-2240 -2241  2242 -360  2245 0

c  -1+1 --> 0
c    ( b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0 ∧  p_360) -> (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧ -b^{1, 361}_0)
c  in CNF:
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_2
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_1
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_0
c  in DIMACS:
-2240  2241 -2242 -360 -2243 0
-2240  2241 -2242 -360 -2244 0
-2240  2241 -2242 -360 -2245 0

c  0+1 --> 1
c    (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧  p_360) -> (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0)
c  in CNF:
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_2
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_1
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨  b^{1, 361}_0
c  in DIMACS:
 2240  2241  2242 -360 -2243 0
 2240  2241  2242 -360 -2244 0
 2240  2241  2242 -360  2245 0

c  1+1 --> 2
c    (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0 ∧  p_360) -> (-b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0)
c  in CNF:
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_2
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨  b^{1, 361}_1
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ -p_360 ∨ -b^{1, 361}_0
c  in DIMACS:
 2240  2241 -2242 -360 -2243 0
 2240  2241 -2242 -360  2244 0
 2240  2241 -2242 -360 -2245 0

c  2+1 --> break 
c    (-b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧  p_360) -> break
c  in CNF:
c     b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 2240 -2241  2242 -360 1162 0


c  2-1 --> 1
c    (-b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧ -p_360) -> (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0)
c  in CNF:
c     b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_2
c     b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_1
c     b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨  b^{1, 361}_0
c  in DIMACS:
 2240 -2241  2242  360 -2243 0
 2240 -2241  2242  360 -2244 0
 2240 -2241  2242  360  2245 0

c  1-1 --> 0
c    (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0 ∧ -p_360) -> (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧ -b^{1, 361}_0)
c  in CNF:
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_2
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_1
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_0
c  in DIMACS:
 2240  2241 -2242  360 -2243 0
 2240  2241 -2242  360 -2244 0
 2240  2241 -2242  360 -2245 0

c  0-1 --> -1
c    (-b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧ -p_360) -> ( b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0)
c  in CNF:
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨  b^{1, 361}_2
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_1
c     b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨  b^{1, 361}_0
c  in DIMACS:
 2240  2241  2242  360  2243 0
 2240  2241  2242  360 -2244 0
 2240  2241  2242  360  2245 0

c  -1-1 --> -2
c    ( b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧  b^{1, 360}_0 ∧ -p_360) -> ( b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0)
c  in CNF:
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨  b^{1, 361}_2
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨  b^{1, 361}_1
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨  p_360 ∨ -b^{1, 361}_0
c  in DIMACS:
-2240  2241 -2242  360  2243 0
-2240  2241 -2242  360  2244 0
-2240  2241 -2242  360 -2245 0

c  -2-1 --> break 
c    ( b^{1, 360}_2 ∧  b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨  b^{1, 360}_0 ∨  p_360 ∨ break
c  in DIMACS:
-2240 -2241  2242  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 360}_2 ∧ -b^{1, 360}_1 ∧ -b^{1, 360}_0 ∧ true) 
c  in CNF:
c    -b^{1, 360}_2 ∨  b^{1, 360}_1 ∨  b^{1, 360}_0 ∨ false 
c  in DIMACS:
-2240  2241  2242  0

c  3 does not represent an automaton state.
c    -(-b^{1, 360}_2 ∧  b^{1, 360}_1 ∧  b^{1, 360}_0 ∧ true) 
c  in CNF:
c     b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ false 
c  in DIMACS:
 2240 -2241 -2242  0
c  -3 does not represent an automaton state.
c    -( b^{1, 360}_2 ∧  b^{1, 360}_1 ∧  b^{1, 360}_0 ∧ true) 
c  in CNF:
c    -b^{1, 360}_2 ∨ -b^{1, 360}_1 ∨ -b^{1, 360}_0 ∨ false 
c  in DIMACS:
-2240 -2241 -2242  0

c i = 361
c  -2+1 --> -1
c    ( b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧  p_361) -> ( b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0)
c  in CNF:
c    -b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨  b^{1, 362}_2
c    -b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_1
c    -b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨  b^{1, 362}_0
c  in DIMACS:
-2243 -2244  2245 -361  2246 0
-2243 -2244  2245 -361 -2247 0
-2243 -2244  2245 -361  2248 0

c  -1+1 --> 0
c    ( b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0 ∧  p_361) -> (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧ -b^{1, 362}_0)
c  in CNF:
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_2
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_1
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_0
c  in DIMACS:
-2243  2244 -2245 -361 -2246 0
-2243  2244 -2245 -361 -2247 0
-2243  2244 -2245 -361 -2248 0

c  0+1 --> 1
c    (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧  p_361) -> (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0)
c  in CNF:
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_2
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_1
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨  b^{1, 362}_0
c  in DIMACS:
 2243  2244  2245 -361 -2246 0
 2243  2244  2245 -361 -2247 0
 2243  2244  2245 -361  2248 0

c  1+1 --> 2
c    (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0 ∧  p_361) -> (-b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0)
c  in CNF:
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_2
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨  b^{1, 362}_1
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ -p_361 ∨ -b^{1, 362}_0
c  in DIMACS:
 2243  2244 -2245 -361 -2246 0
 2243  2244 -2245 -361  2247 0
 2243  2244 -2245 -361 -2248 0

c  2+1 --> break 
c    (-b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧  p_361) -> break
c  in CNF:
c     b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ -p_361 ∨ break
c  in DIMACS:
 2243 -2244  2245 -361 1162 0


c  2-1 --> 1
c    (-b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧ -p_361) -> (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0)
c  in CNF:
c     b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_2
c     b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_1
c     b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨  b^{1, 362}_0
c  in DIMACS:
 2243 -2244  2245  361 -2246 0
 2243 -2244  2245  361 -2247 0
 2243 -2244  2245  361  2248 0

c  1-1 --> 0
c    (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0 ∧ -p_361) -> (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧ -b^{1, 362}_0)
c  in CNF:
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_2
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_1
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_0
c  in DIMACS:
 2243  2244 -2245  361 -2246 0
 2243  2244 -2245  361 -2247 0
 2243  2244 -2245  361 -2248 0

c  0-1 --> -1
c    (-b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧ -p_361) -> ( b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0)
c  in CNF:
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨  b^{1, 362}_2
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_1
c     b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨  b^{1, 362}_0
c  in DIMACS:
 2243  2244  2245  361  2246 0
 2243  2244  2245  361 -2247 0
 2243  2244  2245  361  2248 0

c  -1-1 --> -2
c    ( b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧  b^{1, 361}_0 ∧ -p_361) -> ( b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0)
c  in CNF:
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨  b^{1, 362}_2
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨  b^{1, 362}_1
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨  p_361 ∨ -b^{1, 362}_0
c  in DIMACS:
-2243  2244 -2245  361  2246 0
-2243  2244 -2245  361  2247 0
-2243  2244 -2245  361 -2248 0

c  -2-1 --> break 
c    ( b^{1, 361}_2 ∧  b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧ -p_361) -> break
c  in CNF:
c    -b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨  b^{1, 361}_0 ∨  p_361 ∨ break
c  in DIMACS:
-2243 -2244  2245  361 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 361}_2 ∧ -b^{1, 361}_1 ∧ -b^{1, 361}_0 ∧ true) 
c  in CNF:
c    -b^{1, 361}_2 ∨  b^{1, 361}_1 ∨  b^{1, 361}_0 ∨ false 
c  in DIMACS:
-2243  2244  2245  0

c  3 does not represent an automaton state.
c    -(-b^{1, 361}_2 ∧  b^{1, 361}_1 ∧  b^{1, 361}_0 ∧ true) 
c  in CNF:
c     b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ false 
c  in DIMACS:
 2243 -2244 -2245  0
c  -3 does not represent an automaton state.
c    -( b^{1, 361}_2 ∧  b^{1, 361}_1 ∧  b^{1, 361}_0 ∧ true) 
c  in CNF:
c    -b^{1, 361}_2 ∨ -b^{1, 361}_1 ∨ -b^{1, 361}_0 ∨ false 
c  in DIMACS:
-2243 -2244 -2245  0

c i = 362
c  -2+1 --> -1
c    ( b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧  p_362) -> ( b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0)
c  in CNF:
c    -b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨  b^{1, 363}_2
c    -b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_1
c    -b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨  b^{1, 363}_0
c  in DIMACS:
-2246 -2247  2248 -362  2249 0
-2246 -2247  2248 -362 -2250 0
-2246 -2247  2248 -362  2251 0

c  -1+1 --> 0
c    ( b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0 ∧  p_362) -> (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧ -b^{1, 363}_0)
c  in CNF:
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_2
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_1
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_0
c  in DIMACS:
-2246  2247 -2248 -362 -2249 0
-2246  2247 -2248 -362 -2250 0
-2246  2247 -2248 -362 -2251 0

c  0+1 --> 1
c    (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧  p_362) -> (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0)
c  in CNF:
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_2
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_1
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨  b^{1, 363}_0
c  in DIMACS:
 2246  2247  2248 -362 -2249 0
 2246  2247  2248 -362 -2250 0
 2246  2247  2248 -362  2251 0

c  1+1 --> 2
c    (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0 ∧  p_362) -> (-b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0)
c  in CNF:
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_2
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨  b^{1, 363}_1
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ -p_362 ∨ -b^{1, 363}_0
c  in DIMACS:
 2246  2247 -2248 -362 -2249 0
 2246  2247 -2248 -362  2250 0
 2246  2247 -2248 -362 -2251 0

c  2+1 --> break 
c    (-b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧  p_362) -> break
c  in CNF:
c     b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ -p_362 ∨ break
c  in DIMACS:
 2246 -2247  2248 -362 1162 0


c  2-1 --> 1
c    (-b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧ -p_362) -> (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0)
c  in CNF:
c     b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_2
c     b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_1
c     b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨  b^{1, 363}_0
c  in DIMACS:
 2246 -2247  2248  362 -2249 0
 2246 -2247  2248  362 -2250 0
 2246 -2247  2248  362  2251 0

c  1-1 --> 0
c    (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0 ∧ -p_362) -> (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧ -b^{1, 363}_0)
c  in CNF:
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_2
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_1
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_0
c  in DIMACS:
 2246  2247 -2248  362 -2249 0
 2246  2247 -2248  362 -2250 0
 2246  2247 -2248  362 -2251 0

c  0-1 --> -1
c    (-b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧ -p_362) -> ( b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0)
c  in CNF:
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨  b^{1, 363}_2
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_1
c     b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨  b^{1, 363}_0
c  in DIMACS:
 2246  2247  2248  362  2249 0
 2246  2247  2248  362 -2250 0
 2246  2247  2248  362  2251 0

c  -1-1 --> -2
c    ( b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧  b^{1, 362}_0 ∧ -p_362) -> ( b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0)
c  in CNF:
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨  b^{1, 363}_2
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨  b^{1, 363}_1
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨  p_362 ∨ -b^{1, 363}_0
c  in DIMACS:
-2246  2247 -2248  362  2249 0
-2246  2247 -2248  362  2250 0
-2246  2247 -2248  362 -2251 0

c  -2-1 --> break 
c    ( b^{1, 362}_2 ∧  b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧ -p_362) -> break
c  in CNF:
c    -b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨  b^{1, 362}_0 ∨  p_362 ∨ break
c  in DIMACS:
-2246 -2247  2248  362 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 362}_2 ∧ -b^{1, 362}_1 ∧ -b^{1, 362}_0 ∧ true) 
c  in CNF:
c    -b^{1, 362}_2 ∨  b^{1, 362}_1 ∨  b^{1, 362}_0 ∨ false 
c  in DIMACS:
-2246  2247  2248  0

c  3 does not represent an automaton state.
c    -(-b^{1, 362}_2 ∧  b^{1, 362}_1 ∧  b^{1, 362}_0 ∧ true) 
c  in CNF:
c     b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ false 
c  in DIMACS:
 2246 -2247 -2248  0
c  -3 does not represent an automaton state.
c    -( b^{1, 362}_2 ∧  b^{1, 362}_1 ∧  b^{1, 362}_0 ∧ true) 
c  in CNF:
c    -b^{1, 362}_2 ∨ -b^{1, 362}_1 ∨ -b^{1, 362}_0 ∨ false 
c  in DIMACS:
-2246 -2247 -2248  0

c i = 363
c  -2+1 --> -1
c    ( b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧  p_363) -> ( b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0)
c  in CNF:
c    -b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨  b^{1, 364}_2
c    -b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_1
c    -b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨  b^{1, 364}_0
c  in DIMACS:
-2249 -2250  2251 -363  2252 0
-2249 -2250  2251 -363 -2253 0
-2249 -2250  2251 -363  2254 0

c  -1+1 --> 0
c    ( b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0 ∧  p_363) -> (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧ -b^{1, 364}_0)
c  in CNF:
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_2
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_1
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_0
c  in DIMACS:
-2249  2250 -2251 -363 -2252 0
-2249  2250 -2251 -363 -2253 0
-2249  2250 -2251 -363 -2254 0

c  0+1 --> 1
c    (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧  p_363) -> (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0)
c  in CNF:
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_2
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_1
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨  b^{1, 364}_0
c  in DIMACS:
 2249  2250  2251 -363 -2252 0
 2249  2250  2251 -363 -2253 0
 2249  2250  2251 -363  2254 0

c  1+1 --> 2
c    (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0 ∧  p_363) -> (-b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0)
c  in CNF:
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_2
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨  b^{1, 364}_1
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ -p_363 ∨ -b^{1, 364}_0
c  in DIMACS:
 2249  2250 -2251 -363 -2252 0
 2249  2250 -2251 -363  2253 0
 2249  2250 -2251 -363 -2254 0

c  2+1 --> break 
c    (-b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧  p_363) -> break
c  in CNF:
c     b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 2249 -2250  2251 -363 1162 0


c  2-1 --> 1
c    (-b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧ -p_363) -> (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0)
c  in CNF:
c     b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_2
c     b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_1
c     b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨  b^{1, 364}_0
c  in DIMACS:
 2249 -2250  2251  363 -2252 0
 2249 -2250  2251  363 -2253 0
 2249 -2250  2251  363  2254 0

c  1-1 --> 0
c    (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0 ∧ -p_363) -> (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧ -b^{1, 364}_0)
c  in CNF:
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_2
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_1
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_0
c  in DIMACS:
 2249  2250 -2251  363 -2252 0
 2249  2250 -2251  363 -2253 0
 2249  2250 -2251  363 -2254 0

c  0-1 --> -1
c    (-b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧ -p_363) -> ( b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0)
c  in CNF:
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨  b^{1, 364}_2
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_1
c     b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨  b^{1, 364}_0
c  in DIMACS:
 2249  2250  2251  363  2252 0
 2249  2250  2251  363 -2253 0
 2249  2250  2251  363  2254 0

c  -1-1 --> -2
c    ( b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧  b^{1, 363}_0 ∧ -p_363) -> ( b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0)
c  in CNF:
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨  b^{1, 364}_2
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨  b^{1, 364}_1
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨  p_363 ∨ -b^{1, 364}_0
c  in DIMACS:
-2249  2250 -2251  363  2252 0
-2249  2250 -2251  363  2253 0
-2249  2250 -2251  363 -2254 0

c  -2-1 --> break 
c    ( b^{1, 363}_2 ∧  b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨  b^{1, 363}_0 ∨  p_363 ∨ break
c  in DIMACS:
-2249 -2250  2251  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 363}_2 ∧ -b^{1, 363}_1 ∧ -b^{1, 363}_0 ∧ true) 
c  in CNF:
c    -b^{1, 363}_2 ∨  b^{1, 363}_1 ∨  b^{1, 363}_0 ∨ false 
c  in DIMACS:
-2249  2250  2251  0

c  3 does not represent an automaton state.
c    -(-b^{1, 363}_2 ∧  b^{1, 363}_1 ∧  b^{1, 363}_0 ∧ true) 
c  in CNF:
c     b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ false 
c  in DIMACS:
 2249 -2250 -2251  0
c  -3 does not represent an automaton state.
c    -( b^{1, 363}_2 ∧  b^{1, 363}_1 ∧  b^{1, 363}_0 ∧ true) 
c  in CNF:
c    -b^{1, 363}_2 ∨ -b^{1, 363}_1 ∨ -b^{1, 363}_0 ∨ false 
c  in DIMACS:
-2249 -2250 -2251  0

c i = 364
c  -2+1 --> -1
c    ( b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧  p_364) -> ( b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0)
c  in CNF:
c    -b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨  b^{1, 365}_2
c    -b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_1
c    -b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨  b^{1, 365}_0
c  in DIMACS:
-2252 -2253  2254 -364  2255 0
-2252 -2253  2254 -364 -2256 0
-2252 -2253  2254 -364  2257 0

c  -1+1 --> 0
c    ( b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0 ∧  p_364) -> (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧ -b^{1, 365}_0)
c  in CNF:
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_2
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_1
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_0
c  in DIMACS:
-2252  2253 -2254 -364 -2255 0
-2252  2253 -2254 -364 -2256 0
-2252  2253 -2254 -364 -2257 0

c  0+1 --> 1
c    (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧  p_364) -> (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0)
c  in CNF:
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_2
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_1
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨  b^{1, 365}_0
c  in DIMACS:
 2252  2253  2254 -364 -2255 0
 2252  2253  2254 -364 -2256 0
 2252  2253  2254 -364  2257 0

c  1+1 --> 2
c    (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0 ∧  p_364) -> (-b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0)
c  in CNF:
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_2
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨  b^{1, 365}_1
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ -p_364 ∨ -b^{1, 365}_0
c  in DIMACS:
 2252  2253 -2254 -364 -2255 0
 2252  2253 -2254 -364  2256 0
 2252  2253 -2254 -364 -2257 0

c  2+1 --> break 
c    (-b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧  p_364) -> break
c  in CNF:
c     b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 2252 -2253  2254 -364 1162 0


c  2-1 --> 1
c    (-b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧ -p_364) -> (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0)
c  in CNF:
c     b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_2
c     b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_1
c     b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨  b^{1, 365}_0
c  in DIMACS:
 2252 -2253  2254  364 -2255 0
 2252 -2253  2254  364 -2256 0
 2252 -2253  2254  364  2257 0

c  1-1 --> 0
c    (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0 ∧ -p_364) -> (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧ -b^{1, 365}_0)
c  in CNF:
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_2
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_1
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_0
c  in DIMACS:
 2252  2253 -2254  364 -2255 0
 2252  2253 -2254  364 -2256 0
 2252  2253 -2254  364 -2257 0

c  0-1 --> -1
c    (-b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧ -p_364) -> ( b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0)
c  in CNF:
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨  b^{1, 365}_2
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_1
c     b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨  b^{1, 365}_0
c  in DIMACS:
 2252  2253  2254  364  2255 0
 2252  2253  2254  364 -2256 0
 2252  2253  2254  364  2257 0

c  -1-1 --> -2
c    ( b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧  b^{1, 364}_0 ∧ -p_364) -> ( b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0)
c  in CNF:
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨  b^{1, 365}_2
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨  b^{1, 365}_1
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨  p_364 ∨ -b^{1, 365}_0
c  in DIMACS:
-2252  2253 -2254  364  2255 0
-2252  2253 -2254  364  2256 0
-2252  2253 -2254  364 -2257 0

c  -2-1 --> break 
c    ( b^{1, 364}_2 ∧  b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨  b^{1, 364}_0 ∨  p_364 ∨ break
c  in DIMACS:
-2252 -2253  2254  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 364}_2 ∧ -b^{1, 364}_1 ∧ -b^{1, 364}_0 ∧ true) 
c  in CNF:
c    -b^{1, 364}_2 ∨  b^{1, 364}_1 ∨  b^{1, 364}_0 ∨ false 
c  in DIMACS:
-2252  2253  2254  0

c  3 does not represent an automaton state.
c    -(-b^{1, 364}_2 ∧  b^{1, 364}_1 ∧  b^{1, 364}_0 ∧ true) 
c  in CNF:
c     b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ false 
c  in DIMACS:
 2252 -2253 -2254  0
c  -3 does not represent an automaton state.
c    -( b^{1, 364}_2 ∧  b^{1, 364}_1 ∧  b^{1, 364}_0 ∧ true) 
c  in CNF:
c    -b^{1, 364}_2 ∨ -b^{1, 364}_1 ∨ -b^{1, 364}_0 ∨ false 
c  in DIMACS:
-2252 -2253 -2254  0

c i = 365
c  -2+1 --> -1
c    ( b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧  p_365) -> ( b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0)
c  in CNF:
c    -b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨  b^{1, 366}_2
c    -b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_1
c    -b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨  b^{1, 366}_0
c  in DIMACS:
-2255 -2256  2257 -365  2258 0
-2255 -2256  2257 -365 -2259 0
-2255 -2256  2257 -365  2260 0

c  -1+1 --> 0
c    ( b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0 ∧  p_365) -> (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧ -b^{1, 366}_0)
c  in CNF:
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_2
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_1
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_0
c  in DIMACS:
-2255  2256 -2257 -365 -2258 0
-2255  2256 -2257 -365 -2259 0
-2255  2256 -2257 -365 -2260 0

c  0+1 --> 1
c    (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧  p_365) -> (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0)
c  in CNF:
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_2
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_1
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨  b^{1, 366}_0
c  in DIMACS:
 2255  2256  2257 -365 -2258 0
 2255  2256  2257 -365 -2259 0
 2255  2256  2257 -365  2260 0

c  1+1 --> 2
c    (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0 ∧  p_365) -> (-b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0)
c  in CNF:
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_2
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨  b^{1, 366}_1
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ -p_365 ∨ -b^{1, 366}_0
c  in DIMACS:
 2255  2256 -2257 -365 -2258 0
 2255  2256 -2257 -365  2259 0
 2255  2256 -2257 -365 -2260 0

c  2+1 --> break 
c    (-b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧  p_365) -> break
c  in CNF:
c     b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ -p_365 ∨ break
c  in DIMACS:
 2255 -2256  2257 -365 1162 0


c  2-1 --> 1
c    (-b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧ -p_365) -> (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0)
c  in CNF:
c     b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_2
c     b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_1
c     b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨  b^{1, 366}_0
c  in DIMACS:
 2255 -2256  2257  365 -2258 0
 2255 -2256  2257  365 -2259 0
 2255 -2256  2257  365  2260 0

c  1-1 --> 0
c    (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0 ∧ -p_365) -> (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧ -b^{1, 366}_0)
c  in CNF:
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_2
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_1
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_0
c  in DIMACS:
 2255  2256 -2257  365 -2258 0
 2255  2256 -2257  365 -2259 0
 2255  2256 -2257  365 -2260 0

c  0-1 --> -1
c    (-b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧ -p_365) -> ( b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0)
c  in CNF:
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨  b^{1, 366}_2
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_1
c     b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨  b^{1, 366}_0
c  in DIMACS:
 2255  2256  2257  365  2258 0
 2255  2256  2257  365 -2259 0
 2255  2256  2257  365  2260 0

c  -1-1 --> -2
c    ( b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧  b^{1, 365}_0 ∧ -p_365) -> ( b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0)
c  in CNF:
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨  b^{1, 366}_2
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨  b^{1, 366}_1
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨  p_365 ∨ -b^{1, 366}_0
c  in DIMACS:
-2255  2256 -2257  365  2258 0
-2255  2256 -2257  365  2259 0
-2255  2256 -2257  365 -2260 0

c  -2-1 --> break 
c    ( b^{1, 365}_2 ∧  b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧ -p_365) -> break
c  in CNF:
c    -b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨  b^{1, 365}_0 ∨  p_365 ∨ break
c  in DIMACS:
-2255 -2256  2257  365 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 365}_2 ∧ -b^{1, 365}_1 ∧ -b^{1, 365}_0 ∧ true) 
c  in CNF:
c    -b^{1, 365}_2 ∨  b^{1, 365}_1 ∨  b^{1, 365}_0 ∨ false 
c  in DIMACS:
-2255  2256  2257  0

c  3 does not represent an automaton state.
c    -(-b^{1, 365}_2 ∧  b^{1, 365}_1 ∧  b^{1, 365}_0 ∧ true) 
c  in CNF:
c     b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ false 
c  in DIMACS:
 2255 -2256 -2257  0
c  -3 does not represent an automaton state.
c    -( b^{1, 365}_2 ∧  b^{1, 365}_1 ∧  b^{1, 365}_0 ∧ true) 
c  in CNF:
c    -b^{1, 365}_2 ∨ -b^{1, 365}_1 ∨ -b^{1, 365}_0 ∨ false 
c  in DIMACS:
-2255 -2256 -2257  0

c i = 366
c  -2+1 --> -1
c    ( b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧  p_366) -> ( b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0)
c  in CNF:
c    -b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨  b^{1, 367}_2
c    -b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_1
c    -b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨  b^{1, 367}_0
c  in DIMACS:
-2258 -2259  2260 -366  2261 0
-2258 -2259  2260 -366 -2262 0
-2258 -2259  2260 -366  2263 0

c  -1+1 --> 0
c    ( b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0 ∧  p_366) -> (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧ -b^{1, 367}_0)
c  in CNF:
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_2
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_1
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_0
c  in DIMACS:
-2258  2259 -2260 -366 -2261 0
-2258  2259 -2260 -366 -2262 0
-2258  2259 -2260 -366 -2263 0

c  0+1 --> 1
c    (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧  p_366) -> (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0)
c  in CNF:
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_2
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_1
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨  b^{1, 367}_0
c  in DIMACS:
 2258  2259  2260 -366 -2261 0
 2258  2259  2260 -366 -2262 0
 2258  2259  2260 -366  2263 0

c  1+1 --> 2
c    (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0 ∧  p_366) -> (-b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0)
c  in CNF:
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_2
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨  b^{1, 367}_1
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ -p_366 ∨ -b^{1, 367}_0
c  in DIMACS:
 2258  2259 -2260 -366 -2261 0
 2258  2259 -2260 -366  2262 0
 2258  2259 -2260 -366 -2263 0

c  2+1 --> break 
c    (-b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧  p_366) -> break
c  in CNF:
c     b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 2258 -2259  2260 -366 1162 0


c  2-1 --> 1
c    (-b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧ -p_366) -> (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0)
c  in CNF:
c     b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_2
c     b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_1
c     b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨  b^{1, 367}_0
c  in DIMACS:
 2258 -2259  2260  366 -2261 0
 2258 -2259  2260  366 -2262 0
 2258 -2259  2260  366  2263 0

c  1-1 --> 0
c    (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0 ∧ -p_366) -> (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧ -b^{1, 367}_0)
c  in CNF:
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_2
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_1
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_0
c  in DIMACS:
 2258  2259 -2260  366 -2261 0
 2258  2259 -2260  366 -2262 0
 2258  2259 -2260  366 -2263 0

c  0-1 --> -1
c    (-b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧ -p_366) -> ( b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0)
c  in CNF:
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨  b^{1, 367}_2
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_1
c     b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨  b^{1, 367}_0
c  in DIMACS:
 2258  2259  2260  366  2261 0
 2258  2259  2260  366 -2262 0
 2258  2259  2260  366  2263 0

c  -1-1 --> -2
c    ( b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧  b^{1, 366}_0 ∧ -p_366) -> ( b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0)
c  in CNF:
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨  b^{1, 367}_2
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨  b^{1, 367}_1
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨  p_366 ∨ -b^{1, 367}_0
c  in DIMACS:
-2258  2259 -2260  366  2261 0
-2258  2259 -2260  366  2262 0
-2258  2259 -2260  366 -2263 0

c  -2-1 --> break 
c    ( b^{1, 366}_2 ∧  b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨  b^{1, 366}_0 ∨  p_366 ∨ break
c  in DIMACS:
-2258 -2259  2260  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 366}_2 ∧ -b^{1, 366}_1 ∧ -b^{1, 366}_0 ∧ true) 
c  in CNF:
c    -b^{1, 366}_2 ∨  b^{1, 366}_1 ∨  b^{1, 366}_0 ∨ false 
c  in DIMACS:
-2258  2259  2260  0

c  3 does not represent an automaton state.
c    -(-b^{1, 366}_2 ∧  b^{1, 366}_1 ∧  b^{1, 366}_0 ∧ true) 
c  in CNF:
c     b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ false 
c  in DIMACS:
 2258 -2259 -2260  0
c  -3 does not represent an automaton state.
c    -( b^{1, 366}_2 ∧  b^{1, 366}_1 ∧  b^{1, 366}_0 ∧ true) 
c  in CNF:
c    -b^{1, 366}_2 ∨ -b^{1, 366}_1 ∨ -b^{1, 366}_0 ∨ false 
c  in DIMACS:
-2258 -2259 -2260  0

c i = 367
c  -2+1 --> -1
c    ( b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧  p_367) -> ( b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0)
c  in CNF:
c    -b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨  b^{1, 368}_2
c    -b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_1
c    -b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨  b^{1, 368}_0
c  in DIMACS:
-2261 -2262  2263 -367  2264 0
-2261 -2262  2263 -367 -2265 0
-2261 -2262  2263 -367  2266 0

c  -1+1 --> 0
c    ( b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0 ∧  p_367) -> (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧ -b^{1, 368}_0)
c  in CNF:
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_2
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_1
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_0
c  in DIMACS:
-2261  2262 -2263 -367 -2264 0
-2261  2262 -2263 -367 -2265 0
-2261  2262 -2263 -367 -2266 0

c  0+1 --> 1
c    (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧  p_367) -> (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0)
c  in CNF:
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_2
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_1
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨  b^{1, 368}_0
c  in DIMACS:
 2261  2262  2263 -367 -2264 0
 2261  2262  2263 -367 -2265 0
 2261  2262  2263 -367  2266 0

c  1+1 --> 2
c    (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0 ∧  p_367) -> (-b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0)
c  in CNF:
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_2
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨  b^{1, 368}_1
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ -p_367 ∨ -b^{1, 368}_0
c  in DIMACS:
 2261  2262 -2263 -367 -2264 0
 2261  2262 -2263 -367  2265 0
 2261  2262 -2263 -367 -2266 0

c  2+1 --> break 
c    (-b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧  p_367) -> break
c  in CNF:
c     b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ -p_367 ∨ break
c  in DIMACS:
 2261 -2262  2263 -367 1162 0


c  2-1 --> 1
c    (-b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧ -p_367) -> (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0)
c  in CNF:
c     b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_2
c     b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_1
c     b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨  b^{1, 368}_0
c  in DIMACS:
 2261 -2262  2263  367 -2264 0
 2261 -2262  2263  367 -2265 0
 2261 -2262  2263  367  2266 0

c  1-1 --> 0
c    (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0 ∧ -p_367) -> (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧ -b^{1, 368}_0)
c  in CNF:
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_2
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_1
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_0
c  in DIMACS:
 2261  2262 -2263  367 -2264 0
 2261  2262 -2263  367 -2265 0
 2261  2262 -2263  367 -2266 0

c  0-1 --> -1
c    (-b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧ -p_367) -> ( b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0)
c  in CNF:
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨  b^{1, 368}_2
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_1
c     b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨  b^{1, 368}_0
c  in DIMACS:
 2261  2262  2263  367  2264 0
 2261  2262  2263  367 -2265 0
 2261  2262  2263  367  2266 0

c  -1-1 --> -2
c    ( b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧  b^{1, 367}_0 ∧ -p_367) -> ( b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0)
c  in CNF:
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨  b^{1, 368}_2
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨  b^{1, 368}_1
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨  p_367 ∨ -b^{1, 368}_0
c  in DIMACS:
-2261  2262 -2263  367  2264 0
-2261  2262 -2263  367  2265 0
-2261  2262 -2263  367 -2266 0

c  -2-1 --> break 
c    ( b^{1, 367}_2 ∧  b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧ -p_367) -> break
c  in CNF:
c    -b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨  b^{1, 367}_0 ∨  p_367 ∨ break
c  in DIMACS:
-2261 -2262  2263  367 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 367}_2 ∧ -b^{1, 367}_1 ∧ -b^{1, 367}_0 ∧ true) 
c  in CNF:
c    -b^{1, 367}_2 ∨  b^{1, 367}_1 ∨  b^{1, 367}_0 ∨ false 
c  in DIMACS:
-2261  2262  2263  0

c  3 does not represent an automaton state.
c    -(-b^{1, 367}_2 ∧  b^{1, 367}_1 ∧  b^{1, 367}_0 ∧ true) 
c  in CNF:
c     b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ false 
c  in DIMACS:
 2261 -2262 -2263  0
c  -3 does not represent an automaton state.
c    -( b^{1, 367}_2 ∧  b^{1, 367}_1 ∧  b^{1, 367}_0 ∧ true) 
c  in CNF:
c    -b^{1, 367}_2 ∨ -b^{1, 367}_1 ∨ -b^{1, 367}_0 ∨ false 
c  in DIMACS:
-2261 -2262 -2263  0

c i = 368
c  -2+1 --> -1
c    ( b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧  p_368) -> ( b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0)
c  in CNF:
c    -b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨  b^{1, 369}_2
c    -b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_1
c    -b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨  b^{1, 369}_0
c  in DIMACS:
-2264 -2265  2266 -368  2267 0
-2264 -2265  2266 -368 -2268 0
-2264 -2265  2266 -368  2269 0

c  -1+1 --> 0
c    ( b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0 ∧  p_368) -> (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧ -b^{1, 369}_0)
c  in CNF:
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_2
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_1
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_0
c  in DIMACS:
-2264  2265 -2266 -368 -2267 0
-2264  2265 -2266 -368 -2268 0
-2264  2265 -2266 -368 -2269 0

c  0+1 --> 1
c    (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧  p_368) -> (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0)
c  in CNF:
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_2
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_1
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨  b^{1, 369}_0
c  in DIMACS:
 2264  2265  2266 -368 -2267 0
 2264  2265  2266 -368 -2268 0
 2264  2265  2266 -368  2269 0

c  1+1 --> 2
c    (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0 ∧  p_368) -> (-b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0)
c  in CNF:
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_2
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨  b^{1, 369}_1
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ -p_368 ∨ -b^{1, 369}_0
c  in DIMACS:
 2264  2265 -2266 -368 -2267 0
 2264  2265 -2266 -368  2268 0
 2264  2265 -2266 -368 -2269 0

c  2+1 --> break 
c    (-b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧  p_368) -> break
c  in CNF:
c     b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 2264 -2265  2266 -368 1162 0


c  2-1 --> 1
c    (-b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧ -p_368) -> (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0)
c  in CNF:
c     b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_2
c     b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_1
c     b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨  b^{1, 369}_0
c  in DIMACS:
 2264 -2265  2266  368 -2267 0
 2264 -2265  2266  368 -2268 0
 2264 -2265  2266  368  2269 0

c  1-1 --> 0
c    (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0 ∧ -p_368) -> (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧ -b^{1, 369}_0)
c  in CNF:
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_2
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_1
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_0
c  in DIMACS:
 2264  2265 -2266  368 -2267 0
 2264  2265 -2266  368 -2268 0
 2264  2265 -2266  368 -2269 0

c  0-1 --> -1
c    (-b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧ -p_368) -> ( b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0)
c  in CNF:
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨  b^{1, 369}_2
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_1
c     b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨  b^{1, 369}_0
c  in DIMACS:
 2264  2265  2266  368  2267 0
 2264  2265  2266  368 -2268 0
 2264  2265  2266  368  2269 0

c  -1-1 --> -2
c    ( b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧  b^{1, 368}_0 ∧ -p_368) -> ( b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0)
c  in CNF:
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨  b^{1, 369}_2
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨  b^{1, 369}_1
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨  p_368 ∨ -b^{1, 369}_0
c  in DIMACS:
-2264  2265 -2266  368  2267 0
-2264  2265 -2266  368  2268 0
-2264  2265 -2266  368 -2269 0

c  -2-1 --> break 
c    ( b^{1, 368}_2 ∧  b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨  b^{1, 368}_0 ∨  p_368 ∨ break
c  in DIMACS:
-2264 -2265  2266  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 368}_2 ∧ -b^{1, 368}_1 ∧ -b^{1, 368}_0 ∧ true) 
c  in CNF:
c    -b^{1, 368}_2 ∨  b^{1, 368}_1 ∨  b^{1, 368}_0 ∨ false 
c  in DIMACS:
-2264  2265  2266  0

c  3 does not represent an automaton state.
c    -(-b^{1, 368}_2 ∧  b^{1, 368}_1 ∧  b^{1, 368}_0 ∧ true) 
c  in CNF:
c     b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ false 
c  in DIMACS:
 2264 -2265 -2266  0
c  -3 does not represent an automaton state.
c    -( b^{1, 368}_2 ∧  b^{1, 368}_1 ∧  b^{1, 368}_0 ∧ true) 
c  in CNF:
c    -b^{1, 368}_2 ∨ -b^{1, 368}_1 ∨ -b^{1, 368}_0 ∨ false 
c  in DIMACS:
-2264 -2265 -2266  0

c i = 369
c  -2+1 --> -1
c    ( b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧  p_369) -> ( b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0)
c  in CNF:
c    -b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨  b^{1, 370}_2
c    -b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_1
c    -b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨  b^{1, 370}_0
c  in DIMACS:
-2267 -2268  2269 -369  2270 0
-2267 -2268  2269 -369 -2271 0
-2267 -2268  2269 -369  2272 0

c  -1+1 --> 0
c    ( b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0 ∧  p_369) -> (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧ -b^{1, 370}_0)
c  in CNF:
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_2
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_1
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_0
c  in DIMACS:
-2267  2268 -2269 -369 -2270 0
-2267  2268 -2269 -369 -2271 0
-2267  2268 -2269 -369 -2272 0

c  0+1 --> 1
c    (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧  p_369) -> (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0)
c  in CNF:
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_2
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_1
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨  b^{1, 370}_0
c  in DIMACS:
 2267  2268  2269 -369 -2270 0
 2267  2268  2269 -369 -2271 0
 2267  2268  2269 -369  2272 0

c  1+1 --> 2
c    (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0 ∧  p_369) -> (-b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0)
c  in CNF:
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_2
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨  b^{1, 370}_1
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ -p_369 ∨ -b^{1, 370}_0
c  in DIMACS:
 2267  2268 -2269 -369 -2270 0
 2267  2268 -2269 -369  2271 0
 2267  2268 -2269 -369 -2272 0

c  2+1 --> break 
c    (-b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧  p_369) -> break
c  in CNF:
c     b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 2267 -2268  2269 -369 1162 0


c  2-1 --> 1
c    (-b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧ -p_369) -> (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0)
c  in CNF:
c     b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_2
c     b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_1
c     b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨  b^{1, 370}_0
c  in DIMACS:
 2267 -2268  2269  369 -2270 0
 2267 -2268  2269  369 -2271 0
 2267 -2268  2269  369  2272 0

c  1-1 --> 0
c    (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0 ∧ -p_369) -> (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧ -b^{1, 370}_0)
c  in CNF:
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_2
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_1
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_0
c  in DIMACS:
 2267  2268 -2269  369 -2270 0
 2267  2268 -2269  369 -2271 0
 2267  2268 -2269  369 -2272 0

c  0-1 --> -1
c    (-b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧ -p_369) -> ( b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0)
c  in CNF:
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨  b^{1, 370}_2
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_1
c     b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨  b^{1, 370}_0
c  in DIMACS:
 2267  2268  2269  369  2270 0
 2267  2268  2269  369 -2271 0
 2267  2268  2269  369  2272 0

c  -1-1 --> -2
c    ( b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧  b^{1, 369}_0 ∧ -p_369) -> ( b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0)
c  in CNF:
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨  b^{1, 370}_2
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨  b^{1, 370}_1
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨  p_369 ∨ -b^{1, 370}_0
c  in DIMACS:
-2267  2268 -2269  369  2270 0
-2267  2268 -2269  369  2271 0
-2267  2268 -2269  369 -2272 0

c  -2-1 --> break 
c    ( b^{1, 369}_2 ∧  b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨  b^{1, 369}_0 ∨  p_369 ∨ break
c  in DIMACS:
-2267 -2268  2269  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 369}_2 ∧ -b^{1, 369}_1 ∧ -b^{1, 369}_0 ∧ true) 
c  in CNF:
c    -b^{1, 369}_2 ∨  b^{1, 369}_1 ∨  b^{1, 369}_0 ∨ false 
c  in DIMACS:
-2267  2268  2269  0

c  3 does not represent an automaton state.
c    -(-b^{1, 369}_2 ∧  b^{1, 369}_1 ∧  b^{1, 369}_0 ∧ true) 
c  in CNF:
c     b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ false 
c  in DIMACS:
 2267 -2268 -2269  0
c  -3 does not represent an automaton state.
c    -( b^{1, 369}_2 ∧  b^{1, 369}_1 ∧  b^{1, 369}_0 ∧ true) 
c  in CNF:
c    -b^{1, 369}_2 ∨ -b^{1, 369}_1 ∨ -b^{1, 369}_0 ∨ false 
c  in DIMACS:
-2267 -2268 -2269  0

c i = 370
c  -2+1 --> -1
c    ( b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧  p_370) -> ( b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0)
c  in CNF:
c    -b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨  b^{1, 371}_2
c    -b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_1
c    -b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨  b^{1, 371}_0
c  in DIMACS:
-2270 -2271  2272 -370  2273 0
-2270 -2271  2272 -370 -2274 0
-2270 -2271  2272 -370  2275 0

c  -1+1 --> 0
c    ( b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0 ∧  p_370) -> (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧ -b^{1, 371}_0)
c  in CNF:
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_2
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_1
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_0
c  in DIMACS:
-2270  2271 -2272 -370 -2273 0
-2270  2271 -2272 -370 -2274 0
-2270  2271 -2272 -370 -2275 0

c  0+1 --> 1
c    (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧  p_370) -> (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0)
c  in CNF:
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_2
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_1
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨  b^{1, 371}_0
c  in DIMACS:
 2270  2271  2272 -370 -2273 0
 2270  2271  2272 -370 -2274 0
 2270  2271  2272 -370  2275 0

c  1+1 --> 2
c    (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0 ∧  p_370) -> (-b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0)
c  in CNF:
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_2
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨  b^{1, 371}_1
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ -p_370 ∨ -b^{1, 371}_0
c  in DIMACS:
 2270  2271 -2272 -370 -2273 0
 2270  2271 -2272 -370  2274 0
 2270  2271 -2272 -370 -2275 0

c  2+1 --> break 
c    (-b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧  p_370) -> break
c  in CNF:
c     b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 2270 -2271  2272 -370 1162 0


c  2-1 --> 1
c    (-b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧ -p_370) -> (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0)
c  in CNF:
c     b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_2
c     b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_1
c     b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨  b^{1, 371}_0
c  in DIMACS:
 2270 -2271  2272  370 -2273 0
 2270 -2271  2272  370 -2274 0
 2270 -2271  2272  370  2275 0

c  1-1 --> 0
c    (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0 ∧ -p_370) -> (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧ -b^{1, 371}_0)
c  in CNF:
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_2
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_1
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_0
c  in DIMACS:
 2270  2271 -2272  370 -2273 0
 2270  2271 -2272  370 -2274 0
 2270  2271 -2272  370 -2275 0

c  0-1 --> -1
c    (-b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧ -p_370) -> ( b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0)
c  in CNF:
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨  b^{1, 371}_2
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_1
c     b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨  b^{1, 371}_0
c  in DIMACS:
 2270  2271  2272  370  2273 0
 2270  2271  2272  370 -2274 0
 2270  2271  2272  370  2275 0

c  -1-1 --> -2
c    ( b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧  b^{1, 370}_0 ∧ -p_370) -> ( b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0)
c  in CNF:
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨  b^{1, 371}_2
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨  b^{1, 371}_1
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨  p_370 ∨ -b^{1, 371}_0
c  in DIMACS:
-2270  2271 -2272  370  2273 0
-2270  2271 -2272  370  2274 0
-2270  2271 -2272  370 -2275 0

c  -2-1 --> break 
c    ( b^{1, 370}_2 ∧  b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨  b^{1, 370}_0 ∨  p_370 ∨ break
c  in DIMACS:
-2270 -2271  2272  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 370}_2 ∧ -b^{1, 370}_1 ∧ -b^{1, 370}_0 ∧ true) 
c  in CNF:
c    -b^{1, 370}_2 ∨  b^{1, 370}_1 ∨  b^{1, 370}_0 ∨ false 
c  in DIMACS:
-2270  2271  2272  0

c  3 does not represent an automaton state.
c    -(-b^{1, 370}_2 ∧  b^{1, 370}_1 ∧  b^{1, 370}_0 ∧ true) 
c  in CNF:
c     b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ false 
c  in DIMACS:
 2270 -2271 -2272  0
c  -3 does not represent an automaton state.
c    -( b^{1, 370}_2 ∧  b^{1, 370}_1 ∧  b^{1, 370}_0 ∧ true) 
c  in CNF:
c    -b^{1, 370}_2 ∨ -b^{1, 370}_1 ∨ -b^{1, 370}_0 ∨ false 
c  in DIMACS:
-2270 -2271 -2272  0

c i = 371
c  -2+1 --> -1
c    ( b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧  p_371) -> ( b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0)
c  in CNF:
c    -b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨  b^{1, 372}_2
c    -b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_1
c    -b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨  b^{1, 372}_0
c  in DIMACS:
-2273 -2274  2275 -371  2276 0
-2273 -2274  2275 -371 -2277 0
-2273 -2274  2275 -371  2278 0

c  -1+1 --> 0
c    ( b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0 ∧  p_371) -> (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧ -b^{1, 372}_0)
c  in CNF:
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_2
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_1
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_0
c  in DIMACS:
-2273  2274 -2275 -371 -2276 0
-2273  2274 -2275 -371 -2277 0
-2273  2274 -2275 -371 -2278 0

c  0+1 --> 1
c    (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧  p_371) -> (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0)
c  in CNF:
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_2
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_1
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨  b^{1, 372}_0
c  in DIMACS:
 2273  2274  2275 -371 -2276 0
 2273  2274  2275 -371 -2277 0
 2273  2274  2275 -371  2278 0

c  1+1 --> 2
c    (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0 ∧  p_371) -> (-b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0)
c  in CNF:
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_2
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨  b^{1, 372}_1
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ -p_371 ∨ -b^{1, 372}_0
c  in DIMACS:
 2273  2274 -2275 -371 -2276 0
 2273  2274 -2275 -371  2277 0
 2273  2274 -2275 -371 -2278 0

c  2+1 --> break 
c    (-b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧  p_371) -> break
c  in CNF:
c     b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ -p_371 ∨ break
c  in DIMACS:
 2273 -2274  2275 -371 1162 0


c  2-1 --> 1
c    (-b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧ -p_371) -> (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0)
c  in CNF:
c     b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_2
c     b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_1
c     b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨  b^{1, 372}_0
c  in DIMACS:
 2273 -2274  2275  371 -2276 0
 2273 -2274  2275  371 -2277 0
 2273 -2274  2275  371  2278 0

c  1-1 --> 0
c    (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0 ∧ -p_371) -> (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧ -b^{1, 372}_0)
c  in CNF:
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_2
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_1
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_0
c  in DIMACS:
 2273  2274 -2275  371 -2276 0
 2273  2274 -2275  371 -2277 0
 2273  2274 -2275  371 -2278 0

c  0-1 --> -1
c    (-b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧ -p_371) -> ( b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0)
c  in CNF:
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨  b^{1, 372}_2
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_1
c     b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨  b^{1, 372}_0
c  in DIMACS:
 2273  2274  2275  371  2276 0
 2273  2274  2275  371 -2277 0
 2273  2274  2275  371  2278 0

c  -1-1 --> -2
c    ( b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧  b^{1, 371}_0 ∧ -p_371) -> ( b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0)
c  in CNF:
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨  b^{1, 372}_2
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨  b^{1, 372}_1
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨  p_371 ∨ -b^{1, 372}_0
c  in DIMACS:
-2273  2274 -2275  371  2276 0
-2273  2274 -2275  371  2277 0
-2273  2274 -2275  371 -2278 0

c  -2-1 --> break 
c    ( b^{1, 371}_2 ∧  b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧ -p_371) -> break
c  in CNF:
c    -b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨  b^{1, 371}_0 ∨  p_371 ∨ break
c  in DIMACS:
-2273 -2274  2275  371 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 371}_2 ∧ -b^{1, 371}_1 ∧ -b^{1, 371}_0 ∧ true) 
c  in CNF:
c    -b^{1, 371}_2 ∨  b^{1, 371}_1 ∨  b^{1, 371}_0 ∨ false 
c  in DIMACS:
-2273  2274  2275  0

c  3 does not represent an automaton state.
c    -(-b^{1, 371}_2 ∧  b^{1, 371}_1 ∧  b^{1, 371}_0 ∧ true) 
c  in CNF:
c     b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ false 
c  in DIMACS:
 2273 -2274 -2275  0
c  -3 does not represent an automaton state.
c    -( b^{1, 371}_2 ∧  b^{1, 371}_1 ∧  b^{1, 371}_0 ∧ true) 
c  in CNF:
c    -b^{1, 371}_2 ∨ -b^{1, 371}_1 ∨ -b^{1, 371}_0 ∨ false 
c  in DIMACS:
-2273 -2274 -2275  0

c i = 372
c  -2+1 --> -1
c    ( b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧  p_372) -> ( b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0)
c  in CNF:
c    -b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨  b^{1, 373}_2
c    -b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_1
c    -b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨  b^{1, 373}_0
c  in DIMACS:
-2276 -2277  2278 -372  2279 0
-2276 -2277  2278 -372 -2280 0
-2276 -2277  2278 -372  2281 0

c  -1+1 --> 0
c    ( b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0 ∧  p_372) -> (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧ -b^{1, 373}_0)
c  in CNF:
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_2
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_1
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_0
c  in DIMACS:
-2276  2277 -2278 -372 -2279 0
-2276  2277 -2278 -372 -2280 0
-2276  2277 -2278 -372 -2281 0

c  0+1 --> 1
c    (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧  p_372) -> (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0)
c  in CNF:
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_2
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_1
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨  b^{1, 373}_0
c  in DIMACS:
 2276  2277  2278 -372 -2279 0
 2276  2277  2278 -372 -2280 0
 2276  2277  2278 -372  2281 0

c  1+1 --> 2
c    (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0 ∧  p_372) -> (-b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0)
c  in CNF:
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_2
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨  b^{1, 373}_1
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ -p_372 ∨ -b^{1, 373}_0
c  in DIMACS:
 2276  2277 -2278 -372 -2279 0
 2276  2277 -2278 -372  2280 0
 2276  2277 -2278 -372 -2281 0

c  2+1 --> break 
c    (-b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧  p_372) -> break
c  in CNF:
c     b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 2276 -2277  2278 -372 1162 0


c  2-1 --> 1
c    (-b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧ -p_372) -> (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0)
c  in CNF:
c     b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_2
c     b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_1
c     b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨  b^{1, 373}_0
c  in DIMACS:
 2276 -2277  2278  372 -2279 0
 2276 -2277  2278  372 -2280 0
 2276 -2277  2278  372  2281 0

c  1-1 --> 0
c    (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0 ∧ -p_372) -> (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧ -b^{1, 373}_0)
c  in CNF:
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_2
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_1
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_0
c  in DIMACS:
 2276  2277 -2278  372 -2279 0
 2276  2277 -2278  372 -2280 0
 2276  2277 -2278  372 -2281 0

c  0-1 --> -1
c    (-b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧ -p_372) -> ( b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0)
c  in CNF:
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨  b^{1, 373}_2
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_1
c     b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨  b^{1, 373}_0
c  in DIMACS:
 2276  2277  2278  372  2279 0
 2276  2277  2278  372 -2280 0
 2276  2277  2278  372  2281 0

c  -1-1 --> -2
c    ( b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧  b^{1, 372}_0 ∧ -p_372) -> ( b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0)
c  in CNF:
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨  b^{1, 373}_2
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨  b^{1, 373}_1
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨  p_372 ∨ -b^{1, 373}_0
c  in DIMACS:
-2276  2277 -2278  372  2279 0
-2276  2277 -2278  372  2280 0
-2276  2277 -2278  372 -2281 0

c  -2-1 --> break 
c    ( b^{1, 372}_2 ∧  b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨  b^{1, 372}_0 ∨  p_372 ∨ break
c  in DIMACS:
-2276 -2277  2278  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 372}_2 ∧ -b^{1, 372}_1 ∧ -b^{1, 372}_0 ∧ true) 
c  in CNF:
c    -b^{1, 372}_2 ∨  b^{1, 372}_1 ∨  b^{1, 372}_0 ∨ false 
c  in DIMACS:
-2276  2277  2278  0

c  3 does not represent an automaton state.
c    -(-b^{1, 372}_2 ∧  b^{1, 372}_1 ∧  b^{1, 372}_0 ∧ true) 
c  in CNF:
c     b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ false 
c  in DIMACS:
 2276 -2277 -2278  0
c  -3 does not represent an automaton state.
c    -( b^{1, 372}_2 ∧  b^{1, 372}_1 ∧  b^{1, 372}_0 ∧ true) 
c  in CNF:
c    -b^{1, 372}_2 ∨ -b^{1, 372}_1 ∨ -b^{1, 372}_0 ∨ false 
c  in DIMACS:
-2276 -2277 -2278  0

c i = 373
c  -2+1 --> -1
c    ( b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧  p_373) -> ( b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0)
c  in CNF:
c    -b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨  b^{1, 374}_2
c    -b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_1
c    -b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨  b^{1, 374}_0
c  in DIMACS:
-2279 -2280  2281 -373  2282 0
-2279 -2280  2281 -373 -2283 0
-2279 -2280  2281 -373  2284 0

c  -1+1 --> 0
c    ( b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0 ∧  p_373) -> (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧ -b^{1, 374}_0)
c  in CNF:
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_2
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_1
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_0
c  in DIMACS:
-2279  2280 -2281 -373 -2282 0
-2279  2280 -2281 -373 -2283 0
-2279  2280 -2281 -373 -2284 0

c  0+1 --> 1
c    (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧  p_373) -> (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0)
c  in CNF:
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_2
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_1
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨  b^{1, 374}_0
c  in DIMACS:
 2279  2280  2281 -373 -2282 0
 2279  2280  2281 -373 -2283 0
 2279  2280  2281 -373  2284 0

c  1+1 --> 2
c    (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0 ∧  p_373) -> (-b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0)
c  in CNF:
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_2
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨  b^{1, 374}_1
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ -p_373 ∨ -b^{1, 374}_0
c  in DIMACS:
 2279  2280 -2281 -373 -2282 0
 2279  2280 -2281 -373  2283 0
 2279  2280 -2281 -373 -2284 0

c  2+1 --> break 
c    (-b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧  p_373) -> break
c  in CNF:
c     b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ -p_373 ∨ break
c  in DIMACS:
 2279 -2280  2281 -373 1162 0


c  2-1 --> 1
c    (-b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧ -p_373) -> (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0)
c  in CNF:
c     b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_2
c     b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_1
c     b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨  b^{1, 374}_0
c  in DIMACS:
 2279 -2280  2281  373 -2282 0
 2279 -2280  2281  373 -2283 0
 2279 -2280  2281  373  2284 0

c  1-1 --> 0
c    (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0 ∧ -p_373) -> (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧ -b^{1, 374}_0)
c  in CNF:
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_2
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_1
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_0
c  in DIMACS:
 2279  2280 -2281  373 -2282 0
 2279  2280 -2281  373 -2283 0
 2279  2280 -2281  373 -2284 0

c  0-1 --> -1
c    (-b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧ -p_373) -> ( b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0)
c  in CNF:
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨  b^{1, 374}_2
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_1
c     b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨  b^{1, 374}_0
c  in DIMACS:
 2279  2280  2281  373  2282 0
 2279  2280  2281  373 -2283 0
 2279  2280  2281  373  2284 0

c  -1-1 --> -2
c    ( b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧  b^{1, 373}_0 ∧ -p_373) -> ( b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0)
c  in CNF:
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨  b^{1, 374}_2
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨  b^{1, 374}_1
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨  p_373 ∨ -b^{1, 374}_0
c  in DIMACS:
-2279  2280 -2281  373  2282 0
-2279  2280 -2281  373  2283 0
-2279  2280 -2281  373 -2284 0

c  -2-1 --> break 
c    ( b^{1, 373}_2 ∧  b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧ -p_373) -> break
c  in CNF:
c    -b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨  b^{1, 373}_0 ∨  p_373 ∨ break
c  in DIMACS:
-2279 -2280  2281  373 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 373}_2 ∧ -b^{1, 373}_1 ∧ -b^{1, 373}_0 ∧ true) 
c  in CNF:
c    -b^{1, 373}_2 ∨  b^{1, 373}_1 ∨  b^{1, 373}_0 ∨ false 
c  in DIMACS:
-2279  2280  2281  0

c  3 does not represent an automaton state.
c    -(-b^{1, 373}_2 ∧  b^{1, 373}_1 ∧  b^{1, 373}_0 ∧ true) 
c  in CNF:
c     b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ false 
c  in DIMACS:
 2279 -2280 -2281  0
c  -3 does not represent an automaton state.
c    -( b^{1, 373}_2 ∧  b^{1, 373}_1 ∧  b^{1, 373}_0 ∧ true) 
c  in CNF:
c    -b^{1, 373}_2 ∨ -b^{1, 373}_1 ∨ -b^{1, 373}_0 ∨ false 
c  in DIMACS:
-2279 -2280 -2281  0

c i = 374
c  -2+1 --> -1
c    ( b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧  p_374) -> ( b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0)
c  in CNF:
c    -b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨  b^{1, 375}_2
c    -b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_1
c    -b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨  b^{1, 375}_0
c  in DIMACS:
-2282 -2283  2284 -374  2285 0
-2282 -2283  2284 -374 -2286 0
-2282 -2283  2284 -374  2287 0

c  -1+1 --> 0
c    ( b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0 ∧  p_374) -> (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧ -b^{1, 375}_0)
c  in CNF:
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_2
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_1
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_0
c  in DIMACS:
-2282  2283 -2284 -374 -2285 0
-2282  2283 -2284 -374 -2286 0
-2282  2283 -2284 -374 -2287 0

c  0+1 --> 1
c    (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧  p_374) -> (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0)
c  in CNF:
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_2
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_1
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨  b^{1, 375}_0
c  in DIMACS:
 2282  2283  2284 -374 -2285 0
 2282  2283  2284 -374 -2286 0
 2282  2283  2284 -374  2287 0

c  1+1 --> 2
c    (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0 ∧  p_374) -> (-b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0)
c  in CNF:
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_2
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨  b^{1, 375}_1
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ -p_374 ∨ -b^{1, 375}_0
c  in DIMACS:
 2282  2283 -2284 -374 -2285 0
 2282  2283 -2284 -374  2286 0
 2282  2283 -2284 -374 -2287 0

c  2+1 --> break 
c    (-b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧  p_374) -> break
c  in CNF:
c     b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 2282 -2283  2284 -374 1162 0


c  2-1 --> 1
c    (-b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧ -p_374) -> (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0)
c  in CNF:
c     b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_2
c     b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_1
c     b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨  b^{1, 375}_0
c  in DIMACS:
 2282 -2283  2284  374 -2285 0
 2282 -2283  2284  374 -2286 0
 2282 -2283  2284  374  2287 0

c  1-1 --> 0
c    (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0 ∧ -p_374) -> (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧ -b^{1, 375}_0)
c  in CNF:
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_2
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_1
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_0
c  in DIMACS:
 2282  2283 -2284  374 -2285 0
 2282  2283 -2284  374 -2286 0
 2282  2283 -2284  374 -2287 0

c  0-1 --> -1
c    (-b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧ -p_374) -> ( b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0)
c  in CNF:
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨  b^{1, 375}_2
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_1
c     b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨  b^{1, 375}_0
c  in DIMACS:
 2282  2283  2284  374  2285 0
 2282  2283  2284  374 -2286 0
 2282  2283  2284  374  2287 0

c  -1-1 --> -2
c    ( b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧  b^{1, 374}_0 ∧ -p_374) -> ( b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0)
c  in CNF:
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨  b^{1, 375}_2
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨  b^{1, 375}_1
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨  p_374 ∨ -b^{1, 375}_0
c  in DIMACS:
-2282  2283 -2284  374  2285 0
-2282  2283 -2284  374  2286 0
-2282  2283 -2284  374 -2287 0

c  -2-1 --> break 
c    ( b^{1, 374}_2 ∧  b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨  b^{1, 374}_0 ∨  p_374 ∨ break
c  in DIMACS:
-2282 -2283  2284  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 374}_2 ∧ -b^{1, 374}_1 ∧ -b^{1, 374}_0 ∧ true) 
c  in CNF:
c    -b^{1, 374}_2 ∨  b^{1, 374}_1 ∨  b^{1, 374}_0 ∨ false 
c  in DIMACS:
-2282  2283  2284  0

c  3 does not represent an automaton state.
c    -(-b^{1, 374}_2 ∧  b^{1, 374}_1 ∧  b^{1, 374}_0 ∧ true) 
c  in CNF:
c     b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ false 
c  in DIMACS:
 2282 -2283 -2284  0
c  -3 does not represent an automaton state.
c    -( b^{1, 374}_2 ∧  b^{1, 374}_1 ∧  b^{1, 374}_0 ∧ true) 
c  in CNF:
c    -b^{1, 374}_2 ∨ -b^{1, 374}_1 ∨ -b^{1, 374}_0 ∨ false 
c  in DIMACS:
-2282 -2283 -2284  0

c i = 375
c  -2+1 --> -1
c    ( b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧  p_375) -> ( b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0)
c  in CNF:
c    -b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨  b^{1, 376}_2
c    -b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_1
c    -b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨  b^{1, 376}_0
c  in DIMACS:
-2285 -2286  2287 -375  2288 0
-2285 -2286  2287 -375 -2289 0
-2285 -2286  2287 -375  2290 0

c  -1+1 --> 0
c    ( b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0 ∧  p_375) -> (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧ -b^{1, 376}_0)
c  in CNF:
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_2
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_1
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_0
c  in DIMACS:
-2285  2286 -2287 -375 -2288 0
-2285  2286 -2287 -375 -2289 0
-2285  2286 -2287 -375 -2290 0

c  0+1 --> 1
c    (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧  p_375) -> (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0)
c  in CNF:
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_2
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_1
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨  b^{1, 376}_0
c  in DIMACS:
 2285  2286  2287 -375 -2288 0
 2285  2286  2287 -375 -2289 0
 2285  2286  2287 -375  2290 0

c  1+1 --> 2
c    (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0 ∧  p_375) -> (-b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0)
c  in CNF:
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_2
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨  b^{1, 376}_1
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ -p_375 ∨ -b^{1, 376}_0
c  in DIMACS:
 2285  2286 -2287 -375 -2288 0
 2285  2286 -2287 -375  2289 0
 2285  2286 -2287 -375 -2290 0

c  2+1 --> break 
c    (-b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧  p_375) -> break
c  in CNF:
c     b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 2285 -2286  2287 -375 1162 0


c  2-1 --> 1
c    (-b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧ -p_375) -> (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0)
c  in CNF:
c     b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_2
c     b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_1
c     b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨  b^{1, 376}_0
c  in DIMACS:
 2285 -2286  2287  375 -2288 0
 2285 -2286  2287  375 -2289 0
 2285 -2286  2287  375  2290 0

c  1-1 --> 0
c    (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0 ∧ -p_375) -> (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧ -b^{1, 376}_0)
c  in CNF:
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_2
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_1
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_0
c  in DIMACS:
 2285  2286 -2287  375 -2288 0
 2285  2286 -2287  375 -2289 0
 2285  2286 -2287  375 -2290 0

c  0-1 --> -1
c    (-b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧ -p_375) -> ( b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0)
c  in CNF:
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨  b^{1, 376}_2
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_1
c     b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨  b^{1, 376}_0
c  in DIMACS:
 2285  2286  2287  375  2288 0
 2285  2286  2287  375 -2289 0
 2285  2286  2287  375  2290 0

c  -1-1 --> -2
c    ( b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧  b^{1, 375}_0 ∧ -p_375) -> ( b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0)
c  in CNF:
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨  b^{1, 376}_2
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨  b^{1, 376}_1
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨  p_375 ∨ -b^{1, 376}_0
c  in DIMACS:
-2285  2286 -2287  375  2288 0
-2285  2286 -2287  375  2289 0
-2285  2286 -2287  375 -2290 0

c  -2-1 --> break 
c    ( b^{1, 375}_2 ∧  b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨  b^{1, 375}_0 ∨  p_375 ∨ break
c  in DIMACS:
-2285 -2286  2287  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 375}_2 ∧ -b^{1, 375}_1 ∧ -b^{1, 375}_0 ∧ true) 
c  in CNF:
c    -b^{1, 375}_2 ∨  b^{1, 375}_1 ∨  b^{1, 375}_0 ∨ false 
c  in DIMACS:
-2285  2286  2287  0

c  3 does not represent an automaton state.
c    -(-b^{1, 375}_2 ∧  b^{1, 375}_1 ∧  b^{1, 375}_0 ∧ true) 
c  in CNF:
c     b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ false 
c  in DIMACS:
 2285 -2286 -2287  0
c  -3 does not represent an automaton state.
c    -( b^{1, 375}_2 ∧  b^{1, 375}_1 ∧  b^{1, 375}_0 ∧ true) 
c  in CNF:
c    -b^{1, 375}_2 ∨ -b^{1, 375}_1 ∨ -b^{1, 375}_0 ∨ false 
c  in DIMACS:
-2285 -2286 -2287  0

c i = 376
c  -2+1 --> -1
c    ( b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧  p_376) -> ( b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0)
c  in CNF:
c    -b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨  b^{1, 377}_2
c    -b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_1
c    -b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨  b^{1, 377}_0
c  in DIMACS:
-2288 -2289  2290 -376  2291 0
-2288 -2289  2290 -376 -2292 0
-2288 -2289  2290 -376  2293 0

c  -1+1 --> 0
c    ( b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0 ∧  p_376) -> (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧ -b^{1, 377}_0)
c  in CNF:
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_2
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_1
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_0
c  in DIMACS:
-2288  2289 -2290 -376 -2291 0
-2288  2289 -2290 -376 -2292 0
-2288  2289 -2290 -376 -2293 0

c  0+1 --> 1
c    (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧  p_376) -> (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0)
c  in CNF:
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_2
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_1
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨  b^{1, 377}_0
c  in DIMACS:
 2288  2289  2290 -376 -2291 0
 2288  2289  2290 -376 -2292 0
 2288  2289  2290 -376  2293 0

c  1+1 --> 2
c    (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0 ∧  p_376) -> (-b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0)
c  in CNF:
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_2
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨  b^{1, 377}_1
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ -p_376 ∨ -b^{1, 377}_0
c  in DIMACS:
 2288  2289 -2290 -376 -2291 0
 2288  2289 -2290 -376  2292 0
 2288  2289 -2290 -376 -2293 0

c  2+1 --> break 
c    (-b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧  p_376) -> break
c  in CNF:
c     b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 2288 -2289  2290 -376 1162 0


c  2-1 --> 1
c    (-b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧ -p_376) -> (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0)
c  in CNF:
c     b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_2
c     b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_1
c     b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨  b^{1, 377}_0
c  in DIMACS:
 2288 -2289  2290  376 -2291 0
 2288 -2289  2290  376 -2292 0
 2288 -2289  2290  376  2293 0

c  1-1 --> 0
c    (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0 ∧ -p_376) -> (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧ -b^{1, 377}_0)
c  in CNF:
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_2
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_1
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_0
c  in DIMACS:
 2288  2289 -2290  376 -2291 0
 2288  2289 -2290  376 -2292 0
 2288  2289 -2290  376 -2293 0

c  0-1 --> -1
c    (-b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧ -p_376) -> ( b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0)
c  in CNF:
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨  b^{1, 377}_2
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_1
c     b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨  b^{1, 377}_0
c  in DIMACS:
 2288  2289  2290  376  2291 0
 2288  2289  2290  376 -2292 0
 2288  2289  2290  376  2293 0

c  -1-1 --> -2
c    ( b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧  b^{1, 376}_0 ∧ -p_376) -> ( b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0)
c  in CNF:
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨  b^{1, 377}_2
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨  b^{1, 377}_1
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨  p_376 ∨ -b^{1, 377}_0
c  in DIMACS:
-2288  2289 -2290  376  2291 0
-2288  2289 -2290  376  2292 0
-2288  2289 -2290  376 -2293 0

c  -2-1 --> break 
c    ( b^{1, 376}_2 ∧  b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨  b^{1, 376}_0 ∨  p_376 ∨ break
c  in DIMACS:
-2288 -2289  2290  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 376}_2 ∧ -b^{1, 376}_1 ∧ -b^{1, 376}_0 ∧ true) 
c  in CNF:
c    -b^{1, 376}_2 ∨  b^{1, 376}_1 ∨  b^{1, 376}_0 ∨ false 
c  in DIMACS:
-2288  2289  2290  0

c  3 does not represent an automaton state.
c    -(-b^{1, 376}_2 ∧  b^{1, 376}_1 ∧  b^{1, 376}_0 ∧ true) 
c  in CNF:
c     b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ false 
c  in DIMACS:
 2288 -2289 -2290  0
c  -3 does not represent an automaton state.
c    -( b^{1, 376}_2 ∧  b^{1, 376}_1 ∧  b^{1, 376}_0 ∧ true) 
c  in CNF:
c    -b^{1, 376}_2 ∨ -b^{1, 376}_1 ∨ -b^{1, 376}_0 ∨ false 
c  in DIMACS:
-2288 -2289 -2290  0

c i = 377
c  -2+1 --> -1
c    ( b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧  p_377) -> ( b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0)
c  in CNF:
c    -b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨  b^{1, 378}_2
c    -b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_1
c    -b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨  b^{1, 378}_0
c  in DIMACS:
-2291 -2292  2293 -377  2294 0
-2291 -2292  2293 -377 -2295 0
-2291 -2292  2293 -377  2296 0

c  -1+1 --> 0
c    ( b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0 ∧  p_377) -> (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧ -b^{1, 378}_0)
c  in CNF:
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_2
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_1
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_0
c  in DIMACS:
-2291  2292 -2293 -377 -2294 0
-2291  2292 -2293 -377 -2295 0
-2291  2292 -2293 -377 -2296 0

c  0+1 --> 1
c    (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧  p_377) -> (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0)
c  in CNF:
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_2
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_1
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨  b^{1, 378}_0
c  in DIMACS:
 2291  2292  2293 -377 -2294 0
 2291  2292  2293 -377 -2295 0
 2291  2292  2293 -377  2296 0

c  1+1 --> 2
c    (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0 ∧  p_377) -> (-b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0)
c  in CNF:
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_2
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨  b^{1, 378}_1
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ -p_377 ∨ -b^{1, 378}_0
c  in DIMACS:
 2291  2292 -2293 -377 -2294 0
 2291  2292 -2293 -377  2295 0
 2291  2292 -2293 -377 -2296 0

c  2+1 --> break 
c    (-b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧  p_377) -> break
c  in CNF:
c     b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ -p_377 ∨ break
c  in DIMACS:
 2291 -2292  2293 -377 1162 0


c  2-1 --> 1
c    (-b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧ -p_377) -> (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0)
c  in CNF:
c     b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_2
c     b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_1
c     b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨  b^{1, 378}_0
c  in DIMACS:
 2291 -2292  2293  377 -2294 0
 2291 -2292  2293  377 -2295 0
 2291 -2292  2293  377  2296 0

c  1-1 --> 0
c    (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0 ∧ -p_377) -> (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧ -b^{1, 378}_0)
c  in CNF:
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_2
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_1
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_0
c  in DIMACS:
 2291  2292 -2293  377 -2294 0
 2291  2292 -2293  377 -2295 0
 2291  2292 -2293  377 -2296 0

c  0-1 --> -1
c    (-b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧ -p_377) -> ( b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0)
c  in CNF:
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨  b^{1, 378}_2
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_1
c     b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨  b^{1, 378}_0
c  in DIMACS:
 2291  2292  2293  377  2294 0
 2291  2292  2293  377 -2295 0
 2291  2292  2293  377  2296 0

c  -1-1 --> -2
c    ( b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧  b^{1, 377}_0 ∧ -p_377) -> ( b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0)
c  in CNF:
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨  b^{1, 378}_2
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨  b^{1, 378}_1
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨  p_377 ∨ -b^{1, 378}_0
c  in DIMACS:
-2291  2292 -2293  377  2294 0
-2291  2292 -2293  377  2295 0
-2291  2292 -2293  377 -2296 0

c  -2-1 --> break 
c    ( b^{1, 377}_2 ∧  b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧ -p_377) -> break
c  in CNF:
c    -b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨  b^{1, 377}_0 ∨  p_377 ∨ break
c  in DIMACS:
-2291 -2292  2293  377 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 377}_2 ∧ -b^{1, 377}_1 ∧ -b^{1, 377}_0 ∧ true) 
c  in CNF:
c    -b^{1, 377}_2 ∨  b^{1, 377}_1 ∨  b^{1, 377}_0 ∨ false 
c  in DIMACS:
-2291  2292  2293  0

c  3 does not represent an automaton state.
c    -(-b^{1, 377}_2 ∧  b^{1, 377}_1 ∧  b^{1, 377}_0 ∧ true) 
c  in CNF:
c     b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ false 
c  in DIMACS:
 2291 -2292 -2293  0
c  -3 does not represent an automaton state.
c    -( b^{1, 377}_2 ∧  b^{1, 377}_1 ∧  b^{1, 377}_0 ∧ true) 
c  in CNF:
c    -b^{1, 377}_2 ∨ -b^{1, 377}_1 ∨ -b^{1, 377}_0 ∨ false 
c  in DIMACS:
-2291 -2292 -2293  0

c i = 378
c  -2+1 --> -1
c    ( b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧  p_378) -> ( b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0)
c  in CNF:
c    -b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨  b^{1, 379}_2
c    -b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_1
c    -b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨  b^{1, 379}_0
c  in DIMACS:
-2294 -2295  2296 -378  2297 0
-2294 -2295  2296 -378 -2298 0
-2294 -2295  2296 -378  2299 0

c  -1+1 --> 0
c    ( b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0 ∧  p_378) -> (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧ -b^{1, 379}_0)
c  in CNF:
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_2
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_1
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_0
c  in DIMACS:
-2294  2295 -2296 -378 -2297 0
-2294  2295 -2296 -378 -2298 0
-2294  2295 -2296 -378 -2299 0

c  0+1 --> 1
c    (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧  p_378) -> (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0)
c  in CNF:
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_2
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_1
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨  b^{1, 379}_0
c  in DIMACS:
 2294  2295  2296 -378 -2297 0
 2294  2295  2296 -378 -2298 0
 2294  2295  2296 -378  2299 0

c  1+1 --> 2
c    (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0 ∧  p_378) -> (-b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0)
c  in CNF:
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_2
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨  b^{1, 379}_1
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ -p_378 ∨ -b^{1, 379}_0
c  in DIMACS:
 2294  2295 -2296 -378 -2297 0
 2294  2295 -2296 -378  2298 0
 2294  2295 -2296 -378 -2299 0

c  2+1 --> break 
c    (-b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧  p_378) -> break
c  in CNF:
c     b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 2294 -2295  2296 -378 1162 0


c  2-1 --> 1
c    (-b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧ -p_378) -> (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0)
c  in CNF:
c     b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_2
c     b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_1
c     b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨  b^{1, 379}_0
c  in DIMACS:
 2294 -2295  2296  378 -2297 0
 2294 -2295  2296  378 -2298 0
 2294 -2295  2296  378  2299 0

c  1-1 --> 0
c    (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0 ∧ -p_378) -> (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧ -b^{1, 379}_0)
c  in CNF:
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_2
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_1
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_0
c  in DIMACS:
 2294  2295 -2296  378 -2297 0
 2294  2295 -2296  378 -2298 0
 2294  2295 -2296  378 -2299 0

c  0-1 --> -1
c    (-b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧ -p_378) -> ( b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0)
c  in CNF:
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨  b^{1, 379}_2
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_1
c     b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨  b^{1, 379}_0
c  in DIMACS:
 2294  2295  2296  378  2297 0
 2294  2295  2296  378 -2298 0
 2294  2295  2296  378  2299 0

c  -1-1 --> -2
c    ( b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧  b^{1, 378}_0 ∧ -p_378) -> ( b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0)
c  in CNF:
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨  b^{1, 379}_2
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨  b^{1, 379}_1
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨  p_378 ∨ -b^{1, 379}_0
c  in DIMACS:
-2294  2295 -2296  378  2297 0
-2294  2295 -2296  378  2298 0
-2294  2295 -2296  378 -2299 0

c  -2-1 --> break 
c    ( b^{1, 378}_2 ∧  b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨  b^{1, 378}_0 ∨  p_378 ∨ break
c  in DIMACS:
-2294 -2295  2296  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 378}_2 ∧ -b^{1, 378}_1 ∧ -b^{1, 378}_0 ∧ true) 
c  in CNF:
c    -b^{1, 378}_2 ∨  b^{1, 378}_1 ∨  b^{1, 378}_0 ∨ false 
c  in DIMACS:
-2294  2295  2296  0

c  3 does not represent an automaton state.
c    -(-b^{1, 378}_2 ∧  b^{1, 378}_1 ∧  b^{1, 378}_0 ∧ true) 
c  in CNF:
c     b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ false 
c  in DIMACS:
 2294 -2295 -2296  0
c  -3 does not represent an automaton state.
c    -( b^{1, 378}_2 ∧  b^{1, 378}_1 ∧  b^{1, 378}_0 ∧ true) 
c  in CNF:
c    -b^{1, 378}_2 ∨ -b^{1, 378}_1 ∨ -b^{1, 378}_0 ∨ false 
c  in DIMACS:
-2294 -2295 -2296  0

c i = 379
c  -2+1 --> -1
c    ( b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧  p_379) -> ( b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0)
c  in CNF:
c    -b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨  b^{1, 380}_2
c    -b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_1
c    -b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨  b^{1, 380}_0
c  in DIMACS:
-2297 -2298  2299 -379  2300 0
-2297 -2298  2299 -379 -2301 0
-2297 -2298  2299 -379  2302 0

c  -1+1 --> 0
c    ( b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0 ∧  p_379) -> (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧ -b^{1, 380}_0)
c  in CNF:
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_2
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_1
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_0
c  in DIMACS:
-2297  2298 -2299 -379 -2300 0
-2297  2298 -2299 -379 -2301 0
-2297  2298 -2299 -379 -2302 0

c  0+1 --> 1
c    (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧  p_379) -> (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0)
c  in CNF:
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_2
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_1
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨  b^{1, 380}_0
c  in DIMACS:
 2297  2298  2299 -379 -2300 0
 2297  2298  2299 -379 -2301 0
 2297  2298  2299 -379  2302 0

c  1+1 --> 2
c    (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0 ∧  p_379) -> (-b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0)
c  in CNF:
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_2
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨  b^{1, 380}_1
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ -p_379 ∨ -b^{1, 380}_0
c  in DIMACS:
 2297  2298 -2299 -379 -2300 0
 2297  2298 -2299 -379  2301 0
 2297  2298 -2299 -379 -2302 0

c  2+1 --> break 
c    (-b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧  p_379) -> break
c  in CNF:
c     b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ -p_379 ∨ break
c  in DIMACS:
 2297 -2298  2299 -379 1162 0


c  2-1 --> 1
c    (-b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧ -p_379) -> (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0)
c  in CNF:
c     b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_2
c     b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_1
c     b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨  b^{1, 380}_0
c  in DIMACS:
 2297 -2298  2299  379 -2300 0
 2297 -2298  2299  379 -2301 0
 2297 -2298  2299  379  2302 0

c  1-1 --> 0
c    (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0 ∧ -p_379) -> (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧ -b^{1, 380}_0)
c  in CNF:
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_2
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_1
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_0
c  in DIMACS:
 2297  2298 -2299  379 -2300 0
 2297  2298 -2299  379 -2301 0
 2297  2298 -2299  379 -2302 0

c  0-1 --> -1
c    (-b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧ -p_379) -> ( b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0)
c  in CNF:
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨  b^{1, 380}_2
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_1
c     b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨  b^{1, 380}_0
c  in DIMACS:
 2297  2298  2299  379  2300 0
 2297  2298  2299  379 -2301 0
 2297  2298  2299  379  2302 0

c  -1-1 --> -2
c    ( b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧  b^{1, 379}_0 ∧ -p_379) -> ( b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0)
c  in CNF:
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨  b^{1, 380}_2
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨  b^{1, 380}_1
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨  p_379 ∨ -b^{1, 380}_0
c  in DIMACS:
-2297  2298 -2299  379  2300 0
-2297  2298 -2299  379  2301 0
-2297  2298 -2299  379 -2302 0

c  -2-1 --> break 
c    ( b^{1, 379}_2 ∧  b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧ -p_379) -> break
c  in CNF:
c    -b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨  b^{1, 379}_0 ∨  p_379 ∨ break
c  in DIMACS:
-2297 -2298  2299  379 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 379}_2 ∧ -b^{1, 379}_1 ∧ -b^{1, 379}_0 ∧ true) 
c  in CNF:
c    -b^{1, 379}_2 ∨  b^{1, 379}_1 ∨  b^{1, 379}_0 ∨ false 
c  in DIMACS:
-2297  2298  2299  0

c  3 does not represent an automaton state.
c    -(-b^{1, 379}_2 ∧  b^{1, 379}_1 ∧  b^{1, 379}_0 ∧ true) 
c  in CNF:
c     b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ false 
c  in DIMACS:
 2297 -2298 -2299  0
c  -3 does not represent an automaton state.
c    -( b^{1, 379}_2 ∧  b^{1, 379}_1 ∧  b^{1, 379}_0 ∧ true) 
c  in CNF:
c    -b^{1, 379}_2 ∨ -b^{1, 379}_1 ∨ -b^{1, 379}_0 ∨ false 
c  in DIMACS:
-2297 -2298 -2299  0

c i = 380
c  -2+1 --> -1
c    ( b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧  p_380) -> ( b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0)
c  in CNF:
c    -b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨  b^{1, 381}_2
c    -b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_1
c    -b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨  b^{1, 381}_0
c  in DIMACS:
-2300 -2301  2302 -380  2303 0
-2300 -2301  2302 -380 -2304 0
-2300 -2301  2302 -380  2305 0

c  -1+1 --> 0
c    ( b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0 ∧  p_380) -> (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧ -b^{1, 381}_0)
c  in CNF:
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_2
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_1
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_0
c  in DIMACS:
-2300  2301 -2302 -380 -2303 0
-2300  2301 -2302 -380 -2304 0
-2300  2301 -2302 -380 -2305 0

c  0+1 --> 1
c    (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧  p_380) -> (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0)
c  in CNF:
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_2
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_1
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨  b^{1, 381}_0
c  in DIMACS:
 2300  2301  2302 -380 -2303 0
 2300  2301  2302 -380 -2304 0
 2300  2301  2302 -380  2305 0

c  1+1 --> 2
c    (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0 ∧  p_380) -> (-b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0)
c  in CNF:
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_2
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨  b^{1, 381}_1
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ -p_380 ∨ -b^{1, 381}_0
c  in DIMACS:
 2300  2301 -2302 -380 -2303 0
 2300  2301 -2302 -380  2304 0
 2300  2301 -2302 -380 -2305 0

c  2+1 --> break 
c    (-b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧  p_380) -> break
c  in CNF:
c     b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 2300 -2301  2302 -380 1162 0


c  2-1 --> 1
c    (-b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧ -p_380) -> (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0)
c  in CNF:
c     b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_2
c     b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_1
c     b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨  b^{1, 381}_0
c  in DIMACS:
 2300 -2301  2302  380 -2303 0
 2300 -2301  2302  380 -2304 0
 2300 -2301  2302  380  2305 0

c  1-1 --> 0
c    (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0 ∧ -p_380) -> (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧ -b^{1, 381}_0)
c  in CNF:
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_2
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_1
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_0
c  in DIMACS:
 2300  2301 -2302  380 -2303 0
 2300  2301 -2302  380 -2304 0
 2300  2301 -2302  380 -2305 0

c  0-1 --> -1
c    (-b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧ -p_380) -> ( b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0)
c  in CNF:
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨  b^{1, 381}_2
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_1
c     b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨  b^{1, 381}_0
c  in DIMACS:
 2300  2301  2302  380  2303 0
 2300  2301  2302  380 -2304 0
 2300  2301  2302  380  2305 0

c  -1-1 --> -2
c    ( b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧  b^{1, 380}_0 ∧ -p_380) -> ( b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0)
c  in CNF:
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨  b^{1, 381}_2
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨  b^{1, 381}_1
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨  p_380 ∨ -b^{1, 381}_0
c  in DIMACS:
-2300  2301 -2302  380  2303 0
-2300  2301 -2302  380  2304 0
-2300  2301 -2302  380 -2305 0

c  -2-1 --> break 
c    ( b^{1, 380}_2 ∧  b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨  b^{1, 380}_0 ∨  p_380 ∨ break
c  in DIMACS:
-2300 -2301  2302  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 380}_2 ∧ -b^{1, 380}_1 ∧ -b^{1, 380}_0 ∧ true) 
c  in CNF:
c    -b^{1, 380}_2 ∨  b^{1, 380}_1 ∨  b^{1, 380}_0 ∨ false 
c  in DIMACS:
-2300  2301  2302  0

c  3 does not represent an automaton state.
c    -(-b^{1, 380}_2 ∧  b^{1, 380}_1 ∧  b^{1, 380}_0 ∧ true) 
c  in CNF:
c     b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ false 
c  in DIMACS:
 2300 -2301 -2302  0
c  -3 does not represent an automaton state.
c    -( b^{1, 380}_2 ∧  b^{1, 380}_1 ∧  b^{1, 380}_0 ∧ true) 
c  in CNF:
c    -b^{1, 380}_2 ∨ -b^{1, 380}_1 ∨ -b^{1, 380}_0 ∨ false 
c  in DIMACS:
-2300 -2301 -2302  0

c i = 381
c  -2+1 --> -1
c    ( b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧  p_381) -> ( b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0)
c  in CNF:
c    -b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨  b^{1, 382}_2
c    -b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_1
c    -b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨  b^{1, 382}_0
c  in DIMACS:
-2303 -2304  2305 -381  2306 0
-2303 -2304  2305 -381 -2307 0
-2303 -2304  2305 -381  2308 0

c  -1+1 --> 0
c    ( b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0 ∧  p_381) -> (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧ -b^{1, 382}_0)
c  in CNF:
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_2
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_1
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_0
c  in DIMACS:
-2303  2304 -2305 -381 -2306 0
-2303  2304 -2305 -381 -2307 0
-2303  2304 -2305 -381 -2308 0

c  0+1 --> 1
c    (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧  p_381) -> (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0)
c  in CNF:
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_2
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_1
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨  b^{1, 382}_0
c  in DIMACS:
 2303  2304  2305 -381 -2306 0
 2303  2304  2305 -381 -2307 0
 2303  2304  2305 -381  2308 0

c  1+1 --> 2
c    (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0 ∧  p_381) -> (-b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0)
c  in CNF:
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_2
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨  b^{1, 382}_1
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ -p_381 ∨ -b^{1, 382}_0
c  in DIMACS:
 2303  2304 -2305 -381 -2306 0
 2303  2304 -2305 -381  2307 0
 2303  2304 -2305 -381 -2308 0

c  2+1 --> break 
c    (-b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧  p_381) -> break
c  in CNF:
c     b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ -p_381 ∨ break
c  in DIMACS:
 2303 -2304  2305 -381 1162 0


c  2-1 --> 1
c    (-b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧ -p_381) -> (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0)
c  in CNF:
c     b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_2
c     b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_1
c     b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨  b^{1, 382}_0
c  in DIMACS:
 2303 -2304  2305  381 -2306 0
 2303 -2304  2305  381 -2307 0
 2303 -2304  2305  381  2308 0

c  1-1 --> 0
c    (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0 ∧ -p_381) -> (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧ -b^{1, 382}_0)
c  in CNF:
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_2
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_1
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_0
c  in DIMACS:
 2303  2304 -2305  381 -2306 0
 2303  2304 -2305  381 -2307 0
 2303  2304 -2305  381 -2308 0

c  0-1 --> -1
c    (-b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧ -p_381) -> ( b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0)
c  in CNF:
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨  b^{1, 382}_2
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_1
c     b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨  b^{1, 382}_0
c  in DIMACS:
 2303  2304  2305  381  2306 0
 2303  2304  2305  381 -2307 0
 2303  2304  2305  381  2308 0

c  -1-1 --> -2
c    ( b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧  b^{1, 381}_0 ∧ -p_381) -> ( b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0)
c  in CNF:
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨  b^{1, 382}_2
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨  b^{1, 382}_1
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨  p_381 ∨ -b^{1, 382}_0
c  in DIMACS:
-2303  2304 -2305  381  2306 0
-2303  2304 -2305  381  2307 0
-2303  2304 -2305  381 -2308 0

c  -2-1 --> break 
c    ( b^{1, 381}_2 ∧  b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧ -p_381) -> break
c  in CNF:
c    -b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨  b^{1, 381}_0 ∨  p_381 ∨ break
c  in DIMACS:
-2303 -2304  2305  381 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 381}_2 ∧ -b^{1, 381}_1 ∧ -b^{1, 381}_0 ∧ true) 
c  in CNF:
c    -b^{1, 381}_2 ∨  b^{1, 381}_1 ∨  b^{1, 381}_0 ∨ false 
c  in DIMACS:
-2303  2304  2305  0

c  3 does not represent an automaton state.
c    -(-b^{1, 381}_2 ∧  b^{1, 381}_1 ∧  b^{1, 381}_0 ∧ true) 
c  in CNF:
c     b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ false 
c  in DIMACS:
 2303 -2304 -2305  0
c  -3 does not represent an automaton state.
c    -( b^{1, 381}_2 ∧  b^{1, 381}_1 ∧  b^{1, 381}_0 ∧ true) 
c  in CNF:
c    -b^{1, 381}_2 ∨ -b^{1, 381}_1 ∨ -b^{1, 381}_0 ∨ false 
c  in DIMACS:
-2303 -2304 -2305  0

c i = 382
c  -2+1 --> -1
c    ( b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧  p_382) -> ( b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0)
c  in CNF:
c    -b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨  b^{1, 383}_2
c    -b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_1
c    -b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨  b^{1, 383}_0
c  in DIMACS:
-2306 -2307  2308 -382  2309 0
-2306 -2307  2308 -382 -2310 0
-2306 -2307  2308 -382  2311 0

c  -1+1 --> 0
c    ( b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0 ∧  p_382) -> (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧ -b^{1, 383}_0)
c  in CNF:
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_2
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_1
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_0
c  in DIMACS:
-2306  2307 -2308 -382 -2309 0
-2306  2307 -2308 -382 -2310 0
-2306  2307 -2308 -382 -2311 0

c  0+1 --> 1
c    (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧  p_382) -> (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0)
c  in CNF:
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_2
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_1
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨  b^{1, 383}_0
c  in DIMACS:
 2306  2307  2308 -382 -2309 0
 2306  2307  2308 -382 -2310 0
 2306  2307  2308 -382  2311 0

c  1+1 --> 2
c    (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0 ∧  p_382) -> (-b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0)
c  in CNF:
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_2
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨  b^{1, 383}_1
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ -p_382 ∨ -b^{1, 383}_0
c  in DIMACS:
 2306  2307 -2308 -382 -2309 0
 2306  2307 -2308 -382  2310 0
 2306  2307 -2308 -382 -2311 0

c  2+1 --> break 
c    (-b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧  p_382) -> break
c  in CNF:
c     b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ -p_382 ∨ break
c  in DIMACS:
 2306 -2307  2308 -382 1162 0


c  2-1 --> 1
c    (-b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧ -p_382) -> (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0)
c  in CNF:
c     b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_2
c     b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_1
c     b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨  b^{1, 383}_0
c  in DIMACS:
 2306 -2307  2308  382 -2309 0
 2306 -2307  2308  382 -2310 0
 2306 -2307  2308  382  2311 0

c  1-1 --> 0
c    (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0 ∧ -p_382) -> (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧ -b^{1, 383}_0)
c  in CNF:
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_2
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_1
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_0
c  in DIMACS:
 2306  2307 -2308  382 -2309 0
 2306  2307 -2308  382 -2310 0
 2306  2307 -2308  382 -2311 0

c  0-1 --> -1
c    (-b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧ -p_382) -> ( b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0)
c  in CNF:
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨  b^{1, 383}_2
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_1
c     b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨  b^{1, 383}_0
c  in DIMACS:
 2306  2307  2308  382  2309 0
 2306  2307  2308  382 -2310 0
 2306  2307  2308  382  2311 0

c  -1-1 --> -2
c    ( b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧  b^{1, 382}_0 ∧ -p_382) -> ( b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0)
c  in CNF:
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨  b^{1, 383}_2
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨  b^{1, 383}_1
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨  p_382 ∨ -b^{1, 383}_0
c  in DIMACS:
-2306  2307 -2308  382  2309 0
-2306  2307 -2308  382  2310 0
-2306  2307 -2308  382 -2311 0

c  -2-1 --> break 
c    ( b^{1, 382}_2 ∧  b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧ -p_382) -> break
c  in CNF:
c    -b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨  b^{1, 382}_0 ∨  p_382 ∨ break
c  in DIMACS:
-2306 -2307  2308  382 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 382}_2 ∧ -b^{1, 382}_1 ∧ -b^{1, 382}_0 ∧ true) 
c  in CNF:
c    -b^{1, 382}_2 ∨  b^{1, 382}_1 ∨  b^{1, 382}_0 ∨ false 
c  in DIMACS:
-2306  2307  2308  0

c  3 does not represent an automaton state.
c    -(-b^{1, 382}_2 ∧  b^{1, 382}_1 ∧  b^{1, 382}_0 ∧ true) 
c  in CNF:
c     b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ false 
c  in DIMACS:
 2306 -2307 -2308  0
c  -3 does not represent an automaton state.
c    -( b^{1, 382}_2 ∧  b^{1, 382}_1 ∧  b^{1, 382}_0 ∧ true) 
c  in CNF:
c    -b^{1, 382}_2 ∨ -b^{1, 382}_1 ∨ -b^{1, 382}_0 ∨ false 
c  in DIMACS:
-2306 -2307 -2308  0

c i = 383
c  -2+1 --> -1
c    ( b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧  p_383) -> ( b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0)
c  in CNF:
c    -b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨  b^{1, 384}_2
c    -b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_1
c    -b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨  b^{1, 384}_0
c  in DIMACS:
-2309 -2310  2311 -383  2312 0
-2309 -2310  2311 -383 -2313 0
-2309 -2310  2311 -383  2314 0

c  -1+1 --> 0
c    ( b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0 ∧  p_383) -> (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧ -b^{1, 384}_0)
c  in CNF:
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_2
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_1
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_0
c  in DIMACS:
-2309  2310 -2311 -383 -2312 0
-2309  2310 -2311 -383 -2313 0
-2309  2310 -2311 -383 -2314 0

c  0+1 --> 1
c    (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧  p_383) -> (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0)
c  in CNF:
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_2
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_1
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨  b^{1, 384}_0
c  in DIMACS:
 2309  2310  2311 -383 -2312 0
 2309  2310  2311 -383 -2313 0
 2309  2310  2311 -383  2314 0

c  1+1 --> 2
c    (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0 ∧  p_383) -> (-b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0)
c  in CNF:
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_2
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨  b^{1, 384}_1
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ -p_383 ∨ -b^{1, 384}_0
c  in DIMACS:
 2309  2310 -2311 -383 -2312 0
 2309  2310 -2311 -383  2313 0
 2309  2310 -2311 -383 -2314 0

c  2+1 --> break 
c    (-b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧  p_383) -> break
c  in CNF:
c     b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ -p_383 ∨ break
c  in DIMACS:
 2309 -2310  2311 -383 1162 0


c  2-1 --> 1
c    (-b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧ -p_383) -> (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0)
c  in CNF:
c     b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_2
c     b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_1
c     b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨  b^{1, 384}_0
c  in DIMACS:
 2309 -2310  2311  383 -2312 0
 2309 -2310  2311  383 -2313 0
 2309 -2310  2311  383  2314 0

c  1-1 --> 0
c    (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0 ∧ -p_383) -> (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧ -b^{1, 384}_0)
c  in CNF:
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_2
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_1
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_0
c  in DIMACS:
 2309  2310 -2311  383 -2312 0
 2309  2310 -2311  383 -2313 0
 2309  2310 -2311  383 -2314 0

c  0-1 --> -1
c    (-b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧ -p_383) -> ( b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0)
c  in CNF:
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨  b^{1, 384}_2
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_1
c     b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨  b^{1, 384}_0
c  in DIMACS:
 2309  2310  2311  383  2312 0
 2309  2310  2311  383 -2313 0
 2309  2310  2311  383  2314 0

c  -1-1 --> -2
c    ( b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧  b^{1, 383}_0 ∧ -p_383) -> ( b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0)
c  in CNF:
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨  b^{1, 384}_2
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨  b^{1, 384}_1
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨  p_383 ∨ -b^{1, 384}_0
c  in DIMACS:
-2309  2310 -2311  383  2312 0
-2309  2310 -2311  383  2313 0
-2309  2310 -2311  383 -2314 0

c  -2-1 --> break 
c    ( b^{1, 383}_2 ∧  b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧ -p_383) -> break
c  in CNF:
c    -b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨  b^{1, 383}_0 ∨  p_383 ∨ break
c  in DIMACS:
-2309 -2310  2311  383 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 383}_2 ∧ -b^{1, 383}_1 ∧ -b^{1, 383}_0 ∧ true) 
c  in CNF:
c    -b^{1, 383}_2 ∨  b^{1, 383}_1 ∨  b^{1, 383}_0 ∨ false 
c  in DIMACS:
-2309  2310  2311  0

c  3 does not represent an automaton state.
c    -(-b^{1, 383}_2 ∧  b^{1, 383}_1 ∧  b^{1, 383}_0 ∧ true) 
c  in CNF:
c     b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ false 
c  in DIMACS:
 2309 -2310 -2311  0
c  -3 does not represent an automaton state.
c    -( b^{1, 383}_2 ∧  b^{1, 383}_1 ∧  b^{1, 383}_0 ∧ true) 
c  in CNF:
c    -b^{1, 383}_2 ∨ -b^{1, 383}_1 ∨ -b^{1, 383}_0 ∨ false 
c  in DIMACS:
-2309 -2310 -2311  0

c i = 384
c  -2+1 --> -1
c    ( b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧  p_384) -> ( b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0)
c  in CNF:
c    -b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨  b^{1, 385}_2
c    -b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_1
c    -b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨  b^{1, 385}_0
c  in DIMACS:
-2312 -2313  2314 -384  2315 0
-2312 -2313  2314 -384 -2316 0
-2312 -2313  2314 -384  2317 0

c  -1+1 --> 0
c    ( b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0 ∧  p_384) -> (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧ -b^{1, 385}_0)
c  in CNF:
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_2
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_1
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_0
c  in DIMACS:
-2312  2313 -2314 -384 -2315 0
-2312  2313 -2314 -384 -2316 0
-2312  2313 -2314 -384 -2317 0

c  0+1 --> 1
c    (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧  p_384) -> (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0)
c  in CNF:
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_2
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_1
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨  b^{1, 385}_0
c  in DIMACS:
 2312  2313  2314 -384 -2315 0
 2312  2313  2314 -384 -2316 0
 2312  2313  2314 -384  2317 0

c  1+1 --> 2
c    (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0 ∧  p_384) -> (-b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0)
c  in CNF:
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_2
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨  b^{1, 385}_1
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ -p_384 ∨ -b^{1, 385}_0
c  in DIMACS:
 2312  2313 -2314 -384 -2315 0
 2312  2313 -2314 -384  2316 0
 2312  2313 -2314 -384 -2317 0

c  2+1 --> break 
c    (-b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧  p_384) -> break
c  in CNF:
c     b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 2312 -2313  2314 -384 1162 0


c  2-1 --> 1
c    (-b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧ -p_384) -> (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0)
c  in CNF:
c     b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_2
c     b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_1
c     b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨  b^{1, 385}_0
c  in DIMACS:
 2312 -2313  2314  384 -2315 0
 2312 -2313  2314  384 -2316 0
 2312 -2313  2314  384  2317 0

c  1-1 --> 0
c    (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0 ∧ -p_384) -> (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧ -b^{1, 385}_0)
c  in CNF:
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_2
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_1
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_0
c  in DIMACS:
 2312  2313 -2314  384 -2315 0
 2312  2313 -2314  384 -2316 0
 2312  2313 -2314  384 -2317 0

c  0-1 --> -1
c    (-b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧ -p_384) -> ( b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0)
c  in CNF:
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨  b^{1, 385}_2
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_1
c     b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨  b^{1, 385}_0
c  in DIMACS:
 2312  2313  2314  384  2315 0
 2312  2313  2314  384 -2316 0
 2312  2313  2314  384  2317 0

c  -1-1 --> -2
c    ( b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧  b^{1, 384}_0 ∧ -p_384) -> ( b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0)
c  in CNF:
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨  b^{1, 385}_2
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨  b^{1, 385}_1
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨  p_384 ∨ -b^{1, 385}_0
c  in DIMACS:
-2312  2313 -2314  384  2315 0
-2312  2313 -2314  384  2316 0
-2312  2313 -2314  384 -2317 0

c  -2-1 --> break 
c    ( b^{1, 384}_2 ∧  b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨  b^{1, 384}_0 ∨  p_384 ∨ break
c  in DIMACS:
-2312 -2313  2314  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 384}_2 ∧ -b^{1, 384}_1 ∧ -b^{1, 384}_0 ∧ true) 
c  in CNF:
c    -b^{1, 384}_2 ∨  b^{1, 384}_1 ∨  b^{1, 384}_0 ∨ false 
c  in DIMACS:
-2312  2313  2314  0

c  3 does not represent an automaton state.
c    -(-b^{1, 384}_2 ∧  b^{1, 384}_1 ∧  b^{1, 384}_0 ∧ true) 
c  in CNF:
c     b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ false 
c  in DIMACS:
 2312 -2313 -2314  0
c  -3 does not represent an automaton state.
c    -( b^{1, 384}_2 ∧  b^{1, 384}_1 ∧  b^{1, 384}_0 ∧ true) 
c  in CNF:
c    -b^{1, 384}_2 ∨ -b^{1, 384}_1 ∨ -b^{1, 384}_0 ∨ false 
c  in DIMACS:
-2312 -2313 -2314  0

c i = 385
c  -2+1 --> -1
c    ( b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧  p_385) -> ( b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0)
c  in CNF:
c    -b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨  b^{1, 386}_2
c    -b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_1
c    -b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨  b^{1, 386}_0
c  in DIMACS:
-2315 -2316  2317 -385  2318 0
-2315 -2316  2317 -385 -2319 0
-2315 -2316  2317 -385  2320 0

c  -1+1 --> 0
c    ( b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0 ∧  p_385) -> (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧ -b^{1, 386}_0)
c  in CNF:
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_2
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_1
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_0
c  in DIMACS:
-2315  2316 -2317 -385 -2318 0
-2315  2316 -2317 -385 -2319 0
-2315  2316 -2317 -385 -2320 0

c  0+1 --> 1
c    (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧  p_385) -> (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0)
c  in CNF:
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_2
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_1
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨  b^{1, 386}_0
c  in DIMACS:
 2315  2316  2317 -385 -2318 0
 2315  2316  2317 -385 -2319 0
 2315  2316  2317 -385  2320 0

c  1+1 --> 2
c    (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0 ∧  p_385) -> (-b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0)
c  in CNF:
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_2
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨  b^{1, 386}_1
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ -p_385 ∨ -b^{1, 386}_0
c  in DIMACS:
 2315  2316 -2317 -385 -2318 0
 2315  2316 -2317 -385  2319 0
 2315  2316 -2317 -385 -2320 0

c  2+1 --> break 
c    (-b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧  p_385) -> break
c  in CNF:
c     b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 2315 -2316  2317 -385 1162 0


c  2-1 --> 1
c    (-b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧ -p_385) -> (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0)
c  in CNF:
c     b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_2
c     b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_1
c     b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨  b^{1, 386}_0
c  in DIMACS:
 2315 -2316  2317  385 -2318 0
 2315 -2316  2317  385 -2319 0
 2315 -2316  2317  385  2320 0

c  1-1 --> 0
c    (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0 ∧ -p_385) -> (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧ -b^{1, 386}_0)
c  in CNF:
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_2
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_1
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_0
c  in DIMACS:
 2315  2316 -2317  385 -2318 0
 2315  2316 -2317  385 -2319 0
 2315  2316 -2317  385 -2320 0

c  0-1 --> -1
c    (-b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧ -p_385) -> ( b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0)
c  in CNF:
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨  b^{1, 386}_2
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_1
c     b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨  b^{1, 386}_0
c  in DIMACS:
 2315  2316  2317  385  2318 0
 2315  2316  2317  385 -2319 0
 2315  2316  2317  385  2320 0

c  -1-1 --> -2
c    ( b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧  b^{1, 385}_0 ∧ -p_385) -> ( b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0)
c  in CNF:
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨  b^{1, 386}_2
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨  b^{1, 386}_1
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨  p_385 ∨ -b^{1, 386}_0
c  in DIMACS:
-2315  2316 -2317  385  2318 0
-2315  2316 -2317  385  2319 0
-2315  2316 -2317  385 -2320 0

c  -2-1 --> break 
c    ( b^{1, 385}_2 ∧  b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨  b^{1, 385}_0 ∨  p_385 ∨ break
c  in DIMACS:
-2315 -2316  2317  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 385}_2 ∧ -b^{1, 385}_1 ∧ -b^{1, 385}_0 ∧ true) 
c  in CNF:
c    -b^{1, 385}_2 ∨  b^{1, 385}_1 ∨  b^{1, 385}_0 ∨ false 
c  in DIMACS:
-2315  2316  2317  0

c  3 does not represent an automaton state.
c    -(-b^{1, 385}_2 ∧  b^{1, 385}_1 ∧  b^{1, 385}_0 ∧ true) 
c  in CNF:
c     b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ false 
c  in DIMACS:
 2315 -2316 -2317  0
c  -3 does not represent an automaton state.
c    -( b^{1, 385}_2 ∧  b^{1, 385}_1 ∧  b^{1, 385}_0 ∧ true) 
c  in CNF:
c    -b^{1, 385}_2 ∨ -b^{1, 385}_1 ∨ -b^{1, 385}_0 ∨ false 
c  in DIMACS:
-2315 -2316 -2317  0

c i = 386
c  -2+1 --> -1
c    ( b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧  p_386) -> ( b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0)
c  in CNF:
c    -b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨  b^{1, 387}_2
c    -b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_1
c    -b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨  b^{1, 387}_0
c  in DIMACS:
-2318 -2319  2320 -386  2321 0
-2318 -2319  2320 -386 -2322 0
-2318 -2319  2320 -386  2323 0

c  -1+1 --> 0
c    ( b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0 ∧  p_386) -> (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧ -b^{1, 387}_0)
c  in CNF:
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_2
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_1
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_0
c  in DIMACS:
-2318  2319 -2320 -386 -2321 0
-2318  2319 -2320 -386 -2322 0
-2318  2319 -2320 -386 -2323 0

c  0+1 --> 1
c    (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧  p_386) -> (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0)
c  in CNF:
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_2
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_1
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨  b^{1, 387}_0
c  in DIMACS:
 2318  2319  2320 -386 -2321 0
 2318  2319  2320 -386 -2322 0
 2318  2319  2320 -386  2323 0

c  1+1 --> 2
c    (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0 ∧  p_386) -> (-b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0)
c  in CNF:
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_2
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨  b^{1, 387}_1
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ -p_386 ∨ -b^{1, 387}_0
c  in DIMACS:
 2318  2319 -2320 -386 -2321 0
 2318  2319 -2320 -386  2322 0
 2318  2319 -2320 -386 -2323 0

c  2+1 --> break 
c    (-b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧  p_386) -> break
c  in CNF:
c     b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ -p_386 ∨ break
c  in DIMACS:
 2318 -2319  2320 -386 1162 0


c  2-1 --> 1
c    (-b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧ -p_386) -> (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0)
c  in CNF:
c     b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_2
c     b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_1
c     b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨  b^{1, 387}_0
c  in DIMACS:
 2318 -2319  2320  386 -2321 0
 2318 -2319  2320  386 -2322 0
 2318 -2319  2320  386  2323 0

c  1-1 --> 0
c    (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0 ∧ -p_386) -> (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧ -b^{1, 387}_0)
c  in CNF:
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_2
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_1
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_0
c  in DIMACS:
 2318  2319 -2320  386 -2321 0
 2318  2319 -2320  386 -2322 0
 2318  2319 -2320  386 -2323 0

c  0-1 --> -1
c    (-b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧ -p_386) -> ( b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0)
c  in CNF:
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨  b^{1, 387}_2
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_1
c     b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨  b^{1, 387}_0
c  in DIMACS:
 2318  2319  2320  386  2321 0
 2318  2319  2320  386 -2322 0
 2318  2319  2320  386  2323 0

c  -1-1 --> -2
c    ( b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧  b^{1, 386}_0 ∧ -p_386) -> ( b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0)
c  in CNF:
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨  b^{1, 387}_2
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨  b^{1, 387}_1
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨  p_386 ∨ -b^{1, 387}_0
c  in DIMACS:
-2318  2319 -2320  386  2321 0
-2318  2319 -2320  386  2322 0
-2318  2319 -2320  386 -2323 0

c  -2-1 --> break 
c    ( b^{1, 386}_2 ∧  b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧ -p_386) -> break
c  in CNF:
c    -b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨  b^{1, 386}_0 ∨  p_386 ∨ break
c  in DIMACS:
-2318 -2319  2320  386 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 386}_2 ∧ -b^{1, 386}_1 ∧ -b^{1, 386}_0 ∧ true) 
c  in CNF:
c    -b^{1, 386}_2 ∨  b^{1, 386}_1 ∨  b^{1, 386}_0 ∨ false 
c  in DIMACS:
-2318  2319  2320  0

c  3 does not represent an automaton state.
c    -(-b^{1, 386}_2 ∧  b^{1, 386}_1 ∧  b^{1, 386}_0 ∧ true) 
c  in CNF:
c     b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ false 
c  in DIMACS:
 2318 -2319 -2320  0
c  -3 does not represent an automaton state.
c    -( b^{1, 386}_2 ∧  b^{1, 386}_1 ∧  b^{1, 386}_0 ∧ true) 
c  in CNF:
c    -b^{1, 386}_2 ∨ -b^{1, 386}_1 ∨ -b^{1, 386}_0 ∨ false 
c  in DIMACS:
-2318 -2319 -2320  0

c i = 387
c  -2+1 --> -1
c    ( b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧  p_387) -> ( b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0)
c  in CNF:
c    -b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨  b^{1, 388}_2
c    -b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_1
c    -b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨  b^{1, 388}_0
c  in DIMACS:
-2321 -2322  2323 -387  2324 0
-2321 -2322  2323 -387 -2325 0
-2321 -2322  2323 -387  2326 0

c  -1+1 --> 0
c    ( b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0 ∧  p_387) -> (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧ -b^{1, 388}_0)
c  in CNF:
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_2
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_1
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_0
c  in DIMACS:
-2321  2322 -2323 -387 -2324 0
-2321  2322 -2323 -387 -2325 0
-2321  2322 -2323 -387 -2326 0

c  0+1 --> 1
c    (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧  p_387) -> (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0)
c  in CNF:
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_2
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_1
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨  b^{1, 388}_0
c  in DIMACS:
 2321  2322  2323 -387 -2324 0
 2321  2322  2323 -387 -2325 0
 2321  2322  2323 -387  2326 0

c  1+1 --> 2
c    (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0 ∧  p_387) -> (-b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0)
c  in CNF:
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_2
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨  b^{1, 388}_1
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ -p_387 ∨ -b^{1, 388}_0
c  in DIMACS:
 2321  2322 -2323 -387 -2324 0
 2321  2322 -2323 -387  2325 0
 2321  2322 -2323 -387 -2326 0

c  2+1 --> break 
c    (-b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧  p_387) -> break
c  in CNF:
c     b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 2321 -2322  2323 -387 1162 0


c  2-1 --> 1
c    (-b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧ -p_387) -> (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0)
c  in CNF:
c     b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_2
c     b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_1
c     b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨  b^{1, 388}_0
c  in DIMACS:
 2321 -2322  2323  387 -2324 0
 2321 -2322  2323  387 -2325 0
 2321 -2322  2323  387  2326 0

c  1-1 --> 0
c    (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0 ∧ -p_387) -> (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧ -b^{1, 388}_0)
c  in CNF:
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_2
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_1
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_0
c  in DIMACS:
 2321  2322 -2323  387 -2324 0
 2321  2322 -2323  387 -2325 0
 2321  2322 -2323  387 -2326 0

c  0-1 --> -1
c    (-b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧ -p_387) -> ( b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0)
c  in CNF:
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨  b^{1, 388}_2
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_1
c     b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨  b^{1, 388}_0
c  in DIMACS:
 2321  2322  2323  387  2324 0
 2321  2322  2323  387 -2325 0
 2321  2322  2323  387  2326 0

c  -1-1 --> -2
c    ( b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧  b^{1, 387}_0 ∧ -p_387) -> ( b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0)
c  in CNF:
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨  b^{1, 388}_2
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨  b^{1, 388}_1
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨  p_387 ∨ -b^{1, 388}_0
c  in DIMACS:
-2321  2322 -2323  387  2324 0
-2321  2322 -2323  387  2325 0
-2321  2322 -2323  387 -2326 0

c  -2-1 --> break 
c    ( b^{1, 387}_2 ∧  b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨  b^{1, 387}_0 ∨  p_387 ∨ break
c  in DIMACS:
-2321 -2322  2323  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 387}_2 ∧ -b^{1, 387}_1 ∧ -b^{1, 387}_0 ∧ true) 
c  in CNF:
c    -b^{1, 387}_2 ∨  b^{1, 387}_1 ∨  b^{1, 387}_0 ∨ false 
c  in DIMACS:
-2321  2322  2323  0

c  3 does not represent an automaton state.
c    -(-b^{1, 387}_2 ∧  b^{1, 387}_1 ∧  b^{1, 387}_0 ∧ true) 
c  in CNF:
c     b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ false 
c  in DIMACS:
 2321 -2322 -2323  0
c  -3 does not represent an automaton state.
c    -( b^{1, 387}_2 ∧  b^{1, 387}_1 ∧  b^{1, 387}_0 ∧ true) 
c  in CNF:
c    -b^{1, 387}_2 ∨ -b^{1, 387}_1 ∨ -b^{1, 387}_0 ∨ false 
c  in DIMACS:
-2321 -2322 -2323  0

c i = 388
c  -2+1 --> -1
c    ( b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧  p_388) -> ( b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0)
c  in CNF:
c    -b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨  b^{1, 389}_2
c    -b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_1
c    -b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨  b^{1, 389}_0
c  in DIMACS:
-2324 -2325  2326 -388  2327 0
-2324 -2325  2326 -388 -2328 0
-2324 -2325  2326 -388  2329 0

c  -1+1 --> 0
c    ( b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0 ∧  p_388) -> (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧ -b^{1, 389}_0)
c  in CNF:
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_2
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_1
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_0
c  in DIMACS:
-2324  2325 -2326 -388 -2327 0
-2324  2325 -2326 -388 -2328 0
-2324  2325 -2326 -388 -2329 0

c  0+1 --> 1
c    (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧  p_388) -> (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0)
c  in CNF:
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_2
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_1
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨  b^{1, 389}_0
c  in DIMACS:
 2324  2325  2326 -388 -2327 0
 2324  2325  2326 -388 -2328 0
 2324  2325  2326 -388  2329 0

c  1+1 --> 2
c    (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0 ∧  p_388) -> (-b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0)
c  in CNF:
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_2
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨  b^{1, 389}_1
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ -p_388 ∨ -b^{1, 389}_0
c  in DIMACS:
 2324  2325 -2326 -388 -2327 0
 2324  2325 -2326 -388  2328 0
 2324  2325 -2326 -388 -2329 0

c  2+1 --> break 
c    (-b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧  p_388) -> break
c  in CNF:
c     b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ -p_388 ∨ break
c  in DIMACS:
 2324 -2325  2326 -388 1162 0


c  2-1 --> 1
c    (-b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧ -p_388) -> (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0)
c  in CNF:
c     b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_2
c     b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_1
c     b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨  b^{1, 389}_0
c  in DIMACS:
 2324 -2325  2326  388 -2327 0
 2324 -2325  2326  388 -2328 0
 2324 -2325  2326  388  2329 0

c  1-1 --> 0
c    (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0 ∧ -p_388) -> (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧ -b^{1, 389}_0)
c  in CNF:
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_2
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_1
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_0
c  in DIMACS:
 2324  2325 -2326  388 -2327 0
 2324  2325 -2326  388 -2328 0
 2324  2325 -2326  388 -2329 0

c  0-1 --> -1
c    (-b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧ -p_388) -> ( b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0)
c  in CNF:
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨  b^{1, 389}_2
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_1
c     b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨  b^{1, 389}_0
c  in DIMACS:
 2324  2325  2326  388  2327 0
 2324  2325  2326  388 -2328 0
 2324  2325  2326  388  2329 0

c  -1-1 --> -2
c    ( b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧  b^{1, 388}_0 ∧ -p_388) -> ( b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0)
c  in CNF:
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨  b^{1, 389}_2
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨  b^{1, 389}_1
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨  p_388 ∨ -b^{1, 389}_0
c  in DIMACS:
-2324  2325 -2326  388  2327 0
-2324  2325 -2326  388  2328 0
-2324  2325 -2326  388 -2329 0

c  -2-1 --> break 
c    ( b^{1, 388}_2 ∧  b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧ -p_388) -> break
c  in CNF:
c    -b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨  b^{1, 388}_0 ∨  p_388 ∨ break
c  in DIMACS:
-2324 -2325  2326  388 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 388}_2 ∧ -b^{1, 388}_1 ∧ -b^{1, 388}_0 ∧ true) 
c  in CNF:
c    -b^{1, 388}_2 ∨  b^{1, 388}_1 ∨  b^{1, 388}_0 ∨ false 
c  in DIMACS:
-2324  2325  2326  0

c  3 does not represent an automaton state.
c    -(-b^{1, 388}_2 ∧  b^{1, 388}_1 ∧  b^{1, 388}_0 ∧ true) 
c  in CNF:
c     b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ false 
c  in DIMACS:
 2324 -2325 -2326  0
c  -3 does not represent an automaton state.
c    -( b^{1, 388}_2 ∧  b^{1, 388}_1 ∧  b^{1, 388}_0 ∧ true) 
c  in CNF:
c    -b^{1, 388}_2 ∨ -b^{1, 388}_1 ∨ -b^{1, 388}_0 ∨ false 
c  in DIMACS:
-2324 -2325 -2326  0

c i = 389
c  -2+1 --> -1
c    ( b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧  p_389) -> ( b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0)
c  in CNF:
c    -b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨  b^{1, 390}_2
c    -b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_1
c    -b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨  b^{1, 390}_0
c  in DIMACS:
-2327 -2328  2329 -389  2330 0
-2327 -2328  2329 -389 -2331 0
-2327 -2328  2329 -389  2332 0

c  -1+1 --> 0
c    ( b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0 ∧  p_389) -> (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧ -b^{1, 390}_0)
c  in CNF:
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_2
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_1
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_0
c  in DIMACS:
-2327  2328 -2329 -389 -2330 0
-2327  2328 -2329 -389 -2331 0
-2327  2328 -2329 -389 -2332 0

c  0+1 --> 1
c    (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧  p_389) -> (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0)
c  in CNF:
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_2
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_1
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨  b^{1, 390}_0
c  in DIMACS:
 2327  2328  2329 -389 -2330 0
 2327  2328  2329 -389 -2331 0
 2327  2328  2329 -389  2332 0

c  1+1 --> 2
c    (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0 ∧  p_389) -> (-b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0)
c  in CNF:
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_2
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨  b^{1, 390}_1
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ -p_389 ∨ -b^{1, 390}_0
c  in DIMACS:
 2327  2328 -2329 -389 -2330 0
 2327  2328 -2329 -389  2331 0
 2327  2328 -2329 -389 -2332 0

c  2+1 --> break 
c    (-b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧  p_389) -> break
c  in CNF:
c     b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ -p_389 ∨ break
c  in DIMACS:
 2327 -2328  2329 -389 1162 0


c  2-1 --> 1
c    (-b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧ -p_389) -> (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0)
c  in CNF:
c     b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_2
c     b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_1
c     b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨  b^{1, 390}_0
c  in DIMACS:
 2327 -2328  2329  389 -2330 0
 2327 -2328  2329  389 -2331 0
 2327 -2328  2329  389  2332 0

c  1-1 --> 0
c    (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0 ∧ -p_389) -> (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧ -b^{1, 390}_0)
c  in CNF:
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_2
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_1
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_0
c  in DIMACS:
 2327  2328 -2329  389 -2330 0
 2327  2328 -2329  389 -2331 0
 2327  2328 -2329  389 -2332 0

c  0-1 --> -1
c    (-b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧ -p_389) -> ( b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0)
c  in CNF:
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨  b^{1, 390}_2
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_1
c     b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨  b^{1, 390}_0
c  in DIMACS:
 2327  2328  2329  389  2330 0
 2327  2328  2329  389 -2331 0
 2327  2328  2329  389  2332 0

c  -1-1 --> -2
c    ( b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧  b^{1, 389}_0 ∧ -p_389) -> ( b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0)
c  in CNF:
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨  b^{1, 390}_2
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨  b^{1, 390}_1
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨  p_389 ∨ -b^{1, 390}_0
c  in DIMACS:
-2327  2328 -2329  389  2330 0
-2327  2328 -2329  389  2331 0
-2327  2328 -2329  389 -2332 0

c  -2-1 --> break 
c    ( b^{1, 389}_2 ∧  b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧ -p_389) -> break
c  in CNF:
c    -b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨  b^{1, 389}_0 ∨  p_389 ∨ break
c  in DIMACS:
-2327 -2328  2329  389 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 389}_2 ∧ -b^{1, 389}_1 ∧ -b^{1, 389}_0 ∧ true) 
c  in CNF:
c    -b^{1, 389}_2 ∨  b^{1, 389}_1 ∨  b^{1, 389}_0 ∨ false 
c  in DIMACS:
-2327  2328  2329  0

c  3 does not represent an automaton state.
c    -(-b^{1, 389}_2 ∧  b^{1, 389}_1 ∧  b^{1, 389}_0 ∧ true) 
c  in CNF:
c     b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ false 
c  in DIMACS:
 2327 -2328 -2329  0
c  -3 does not represent an automaton state.
c    -( b^{1, 389}_2 ∧  b^{1, 389}_1 ∧  b^{1, 389}_0 ∧ true) 
c  in CNF:
c    -b^{1, 389}_2 ∨ -b^{1, 389}_1 ∨ -b^{1, 389}_0 ∨ false 
c  in DIMACS:
-2327 -2328 -2329  0

c i = 390
c  -2+1 --> -1
c    ( b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧  p_390) -> ( b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0)
c  in CNF:
c    -b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨  b^{1, 391}_2
c    -b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_1
c    -b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨  b^{1, 391}_0
c  in DIMACS:
-2330 -2331  2332 -390  2333 0
-2330 -2331  2332 -390 -2334 0
-2330 -2331  2332 -390  2335 0

c  -1+1 --> 0
c    ( b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0 ∧  p_390) -> (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧ -b^{1, 391}_0)
c  in CNF:
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_2
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_1
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_0
c  in DIMACS:
-2330  2331 -2332 -390 -2333 0
-2330  2331 -2332 -390 -2334 0
-2330  2331 -2332 -390 -2335 0

c  0+1 --> 1
c    (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧  p_390) -> (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0)
c  in CNF:
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_2
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_1
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨  b^{1, 391}_0
c  in DIMACS:
 2330  2331  2332 -390 -2333 0
 2330  2331  2332 -390 -2334 0
 2330  2331  2332 -390  2335 0

c  1+1 --> 2
c    (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0 ∧  p_390) -> (-b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0)
c  in CNF:
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_2
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨  b^{1, 391}_1
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ -p_390 ∨ -b^{1, 391}_0
c  in DIMACS:
 2330  2331 -2332 -390 -2333 0
 2330  2331 -2332 -390  2334 0
 2330  2331 -2332 -390 -2335 0

c  2+1 --> break 
c    (-b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧  p_390) -> break
c  in CNF:
c     b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 2330 -2331  2332 -390 1162 0


c  2-1 --> 1
c    (-b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧ -p_390) -> (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0)
c  in CNF:
c     b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_2
c     b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_1
c     b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨  b^{1, 391}_0
c  in DIMACS:
 2330 -2331  2332  390 -2333 0
 2330 -2331  2332  390 -2334 0
 2330 -2331  2332  390  2335 0

c  1-1 --> 0
c    (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0 ∧ -p_390) -> (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧ -b^{1, 391}_0)
c  in CNF:
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_2
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_1
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_0
c  in DIMACS:
 2330  2331 -2332  390 -2333 0
 2330  2331 -2332  390 -2334 0
 2330  2331 -2332  390 -2335 0

c  0-1 --> -1
c    (-b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧ -p_390) -> ( b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0)
c  in CNF:
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨  b^{1, 391}_2
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_1
c     b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨  b^{1, 391}_0
c  in DIMACS:
 2330  2331  2332  390  2333 0
 2330  2331  2332  390 -2334 0
 2330  2331  2332  390  2335 0

c  -1-1 --> -2
c    ( b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧  b^{1, 390}_0 ∧ -p_390) -> ( b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0)
c  in CNF:
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨  b^{1, 391}_2
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨  b^{1, 391}_1
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨  p_390 ∨ -b^{1, 391}_0
c  in DIMACS:
-2330  2331 -2332  390  2333 0
-2330  2331 -2332  390  2334 0
-2330  2331 -2332  390 -2335 0

c  -2-1 --> break 
c    ( b^{1, 390}_2 ∧  b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨  b^{1, 390}_0 ∨  p_390 ∨ break
c  in DIMACS:
-2330 -2331  2332  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 390}_2 ∧ -b^{1, 390}_1 ∧ -b^{1, 390}_0 ∧ true) 
c  in CNF:
c    -b^{1, 390}_2 ∨  b^{1, 390}_1 ∨  b^{1, 390}_0 ∨ false 
c  in DIMACS:
-2330  2331  2332  0

c  3 does not represent an automaton state.
c    -(-b^{1, 390}_2 ∧  b^{1, 390}_1 ∧  b^{1, 390}_0 ∧ true) 
c  in CNF:
c     b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ false 
c  in DIMACS:
 2330 -2331 -2332  0
c  -3 does not represent an automaton state.
c    -( b^{1, 390}_2 ∧  b^{1, 390}_1 ∧  b^{1, 390}_0 ∧ true) 
c  in CNF:
c    -b^{1, 390}_2 ∨ -b^{1, 390}_1 ∨ -b^{1, 390}_0 ∨ false 
c  in DIMACS:
-2330 -2331 -2332  0

c i = 391
c  -2+1 --> -1
c    ( b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧  p_391) -> ( b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0)
c  in CNF:
c    -b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨  b^{1, 392}_2
c    -b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_1
c    -b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨  b^{1, 392}_0
c  in DIMACS:
-2333 -2334  2335 -391  2336 0
-2333 -2334  2335 -391 -2337 0
-2333 -2334  2335 -391  2338 0

c  -1+1 --> 0
c    ( b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0 ∧  p_391) -> (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧ -b^{1, 392}_0)
c  in CNF:
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_2
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_1
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_0
c  in DIMACS:
-2333  2334 -2335 -391 -2336 0
-2333  2334 -2335 -391 -2337 0
-2333  2334 -2335 -391 -2338 0

c  0+1 --> 1
c    (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧  p_391) -> (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0)
c  in CNF:
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_2
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_1
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨  b^{1, 392}_0
c  in DIMACS:
 2333  2334  2335 -391 -2336 0
 2333  2334  2335 -391 -2337 0
 2333  2334  2335 -391  2338 0

c  1+1 --> 2
c    (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0 ∧  p_391) -> (-b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0)
c  in CNF:
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_2
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨  b^{1, 392}_1
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ -p_391 ∨ -b^{1, 392}_0
c  in DIMACS:
 2333  2334 -2335 -391 -2336 0
 2333  2334 -2335 -391  2337 0
 2333  2334 -2335 -391 -2338 0

c  2+1 --> break 
c    (-b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧  p_391) -> break
c  in CNF:
c     b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ -p_391 ∨ break
c  in DIMACS:
 2333 -2334  2335 -391 1162 0


c  2-1 --> 1
c    (-b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧ -p_391) -> (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0)
c  in CNF:
c     b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_2
c     b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_1
c     b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨  b^{1, 392}_0
c  in DIMACS:
 2333 -2334  2335  391 -2336 0
 2333 -2334  2335  391 -2337 0
 2333 -2334  2335  391  2338 0

c  1-1 --> 0
c    (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0 ∧ -p_391) -> (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧ -b^{1, 392}_0)
c  in CNF:
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_2
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_1
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_0
c  in DIMACS:
 2333  2334 -2335  391 -2336 0
 2333  2334 -2335  391 -2337 0
 2333  2334 -2335  391 -2338 0

c  0-1 --> -1
c    (-b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧ -p_391) -> ( b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0)
c  in CNF:
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨  b^{1, 392}_2
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_1
c     b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨  b^{1, 392}_0
c  in DIMACS:
 2333  2334  2335  391  2336 0
 2333  2334  2335  391 -2337 0
 2333  2334  2335  391  2338 0

c  -1-1 --> -2
c    ( b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧  b^{1, 391}_0 ∧ -p_391) -> ( b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0)
c  in CNF:
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨  b^{1, 392}_2
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨  b^{1, 392}_1
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨  p_391 ∨ -b^{1, 392}_0
c  in DIMACS:
-2333  2334 -2335  391  2336 0
-2333  2334 -2335  391  2337 0
-2333  2334 -2335  391 -2338 0

c  -2-1 --> break 
c    ( b^{1, 391}_2 ∧  b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧ -p_391) -> break
c  in CNF:
c    -b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨  b^{1, 391}_0 ∨  p_391 ∨ break
c  in DIMACS:
-2333 -2334  2335  391 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 391}_2 ∧ -b^{1, 391}_1 ∧ -b^{1, 391}_0 ∧ true) 
c  in CNF:
c    -b^{1, 391}_2 ∨  b^{1, 391}_1 ∨  b^{1, 391}_0 ∨ false 
c  in DIMACS:
-2333  2334  2335  0

c  3 does not represent an automaton state.
c    -(-b^{1, 391}_2 ∧  b^{1, 391}_1 ∧  b^{1, 391}_0 ∧ true) 
c  in CNF:
c     b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ false 
c  in DIMACS:
 2333 -2334 -2335  0
c  -3 does not represent an automaton state.
c    -( b^{1, 391}_2 ∧  b^{1, 391}_1 ∧  b^{1, 391}_0 ∧ true) 
c  in CNF:
c    -b^{1, 391}_2 ∨ -b^{1, 391}_1 ∨ -b^{1, 391}_0 ∨ false 
c  in DIMACS:
-2333 -2334 -2335  0

c i = 392
c  -2+1 --> -1
c    ( b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧  p_392) -> ( b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0)
c  in CNF:
c    -b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨  b^{1, 393}_2
c    -b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_1
c    -b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨  b^{1, 393}_0
c  in DIMACS:
-2336 -2337  2338 -392  2339 0
-2336 -2337  2338 -392 -2340 0
-2336 -2337  2338 -392  2341 0

c  -1+1 --> 0
c    ( b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0 ∧  p_392) -> (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧ -b^{1, 393}_0)
c  in CNF:
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_2
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_1
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_0
c  in DIMACS:
-2336  2337 -2338 -392 -2339 0
-2336  2337 -2338 -392 -2340 0
-2336  2337 -2338 -392 -2341 0

c  0+1 --> 1
c    (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧  p_392) -> (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0)
c  in CNF:
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_2
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_1
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨  b^{1, 393}_0
c  in DIMACS:
 2336  2337  2338 -392 -2339 0
 2336  2337  2338 -392 -2340 0
 2336  2337  2338 -392  2341 0

c  1+1 --> 2
c    (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0 ∧  p_392) -> (-b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0)
c  in CNF:
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_2
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨  b^{1, 393}_1
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ -p_392 ∨ -b^{1, 393}_0
c  in DIMACS:
 2336  2337 -2338 -392 -2339 0
 2336  2337 -2338 -392  2340 0
 2336  2337 -2338 -392 -2341 0

c  2+1 --> break 
c    (-b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧  p_392) -> break
c  in CNF:
c     b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 2336 -2337  2338 -392 1162 0


c  2-1 --> 1
c    (-b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧ -p_392) -> (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0)
c  in CNF:
c     b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_2
c     b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_1
c     b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨  b^{1, 393}_0
c  in DIMACS:
 2336 -2337  2338  392 -2339 0
 2336 -2337  2338  392 -2340 0
 2336 -2337  2338  392  2341 0

c  1-1 --> 0
c    (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0 ∧ -p_392) -> (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧ -b^{1, 393}_0)
c  in CNF:
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_2
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_1
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_0
c  in DIMACS:
 2336  2337 -2338  392 -2339 0
 2336  2337 -2338  392 -2340 0
 2336  2337 -2338  392 -2341 0

c  0-1 --> -1
c    (-b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧ -p_392) -> ( b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0)
c  in CNF:
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨  b^{1, 393}_2
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_1
c     b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨  b^{1, 393}_0
c  in DIMACS:
 2336  2337  2338  392  2339 0
 2336  2337  2338  392 -2340 0
 2336  2337  2338  392  2341 0

c  -1-1 --> -2
c    ( b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧  b^{1, 392}_0 ∧ -p_392) -> ( b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0)
c  in CNF:
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨  b^{1, 393}_2
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨  b^{1, 393}_1
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨  p_392 ∨ -b^{1, 393}_0
c  in DIMACS:
-2336  2337 -2338  392  2339 0
-2336  2337 -2338  392  2340 0
-2336  2337 -2338  392 -2341 0

c  -2-1 --> break 
c    ( b^{1, 392}_2 ∧  b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨  b^{1, 392}_0 ∨  p_392 ∨ break
c  in DIMACS:
-2336 -2337  2338  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 392}_2 ∧ -b^{1, 392}_1 ∧ -b^{1, 392}_0 ∧ true) 
c  in CNF:
c    -b^{1, 392}_2 ∨  b^{1, 392}_1 ∨  b^{1, 392}_0 ∨ false 
c  in DIMACS:
-2336  2337  2338  0

c  3 does not represent an automaton state.
c    -(-b^{1, 392}_2 ∧  b^{1, 392}_1 ∧  b^{1, 392}_0 ∧ true) 
c  in CNF:
c     b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ false 
c  in DIMACS:
 2336 -2337 -2338  0
c  -3 does not represent an automaton state.
c    -( b^{1, 392}_2 ∧  b^{1, 392}_1 ∧  b^{1, 392}_0 ∧ true) 
c  in CNF:
c    -b^{1, 392}_2 ∨ -b^{1, 392}_1 ∨ -b^{1, 392}_0 ∨ false 
c  in DIMACS:
-2336 -2337 -2338  0

c i = 393
c  -2+1 --> -1
c    ( b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧  p_393) -> ( b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0)
c  in CNF:
c    -b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨  b^{1, 394}_2
c    -b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_1
c    -b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨  b^{1, 394}_0
c  in DIMACS:
-2339 -2340  2341 -393  2342 0
-2339 -2340  2341 -393 -2343 0
-2339 -2340  2341 -393  2344 0

c  -1+1 --> 0
c    ( b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0 ∧  p_393) -> (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧ -b^{1, 394}_0)
c  in CNF:
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_2
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_1
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_0
c  in DIMACS:
-2339  2340 -2341 -393 -2342 0
-2339  2340 -2341 -393 -2343 0
-2339  2340 -2341 -393 -2344 0

c  0+1 --> 1
c    (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧  p_393) -> (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0)
c  in CNF:
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_2
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_1
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨  b^{1, 394}_0
c  in DIMACS:
 2339  2340  2341 -393 -2342 0
 2339  2340  2341 -393 -2343 0
 2339  2340  2341 -393  2344 0

c  1+1 --> 2
c    (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0 ∧  p_393) -> (-b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0)
c  in CNF:
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_2
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨  b^{1, 394}_1
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ -p_393 ∨ -b^{1, 394}_0
c  in DIMACS:
 2339  2340 -2341 -393 -2342 0
 2339  2340 -2341 -393  2343 0
 2339  2340 -2341 -393 -2344 0

c  2+1 --> break 
c    (-b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧  p_393) -> break
c  in CNF:
c     b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ -p_393 ∨ break
c  in DIMACS:
 2339 -2340  2341 -393 1162 0


c  2-1 --> 1
c    (-b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧ -p_393) -> (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0)
c  in CNF:
c     b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_2
c     b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_1
c     b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨  b^{1, 394}_0
c  in DIMACS:
 2339 -2340  2341  393 -2342 0
 2339 -2340  2341  393 -2343 0
 2339 -2340  2341  393  2344 0

c  1-1 --> 0
c    (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0 ∧ -p_393) -> (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧ -b^{1, 394}_0)
c  in CNF:
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_2
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_1
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_0
c  in DIMACS:
 2339  2340 -2341  393 -2342 0
 2339  2340 -2341  393 -2343 0
 2339  2340 -2341  393 -2344 0

c  0-1 --> -1
c    (-b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧ -p_393) -> ( b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0)
c  in CNF:
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨  b^{1, 394}_2
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_1
c     b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨  b^{1, 394}_0
c  in DIMACS:
 2339  2340  2341  393  2342 0
 2339  2340  2341  393 -2343 0
 2339  2340  2341  393  2344 0

c  -1-1 --> -2
c    ( b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧  b^{1, 393}_0 ∧ -p_393) -> ( b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0)
c  in CNF:
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨  b^{1, 394}_2
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨  b^{1, 394}_1
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨  p_393 ∨ -b^{1, 394}_0
c  in DIMACS:
-2339  2340 -2341  393  2342 0
-2339  2340 -2341  393  2343 0
-2339  2340 -2341  393 -2344 0

c  -2-1 --> break 
c    ( b^{1, 393}_2 ∧  b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧ -p_393) -> break
c  in CNF:
c    -b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨  b^{1, 393}_0 ∨  p_393 ∨ break
c  in DIMACS:
-2339 -2340  2341  393 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 393}_2 ∧ -b^{1, 393}_1 ∧ -b^{1, 393}_0 ∧ true) 
c  in CNF:
c    -b^{1, 393}_2 ∨  b^{1, 393}_1 ∨  b^{1, 393}_0 ∨ false 
c  in DIMACS:
-2339  2340  2341  0

c  3 does not represent an automaton state.
c    -(-b^{1, 393}_2 ∧  b^{1, 393}_1 ∧  b^{1, 393}_0 ∧ true) 
c  in CNF:
c     b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ false 
c  in DIMACS:
 2339 -2340 -2341  0
c  -3 does not represent an automaton state.
c    -( b^{1, 393}_2 ∧  b^{1, 393}_1 ∧  b^{1, 393}_0 ∧ true) 
c  in CNF:
c    -b^{1, 393}_2 ∨ -b^{1, 393}_1 ∨ -b^{1, 393}_0 ∨ false 
c  in DIMACS:
-2339 -2340 -2341  0

c i = 394
c  -2+1 --> -1
c    ( b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧  p_394) -> ( b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0)
c  in CNF:
c    -b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨  b^{1, 395}_2
c    -b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_1
c    -b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨  b^{1, 395}_0
c  in DIMACS:
-2342 -2343  2344 -394  2345 0
-2342 -2343  2344 -394 -2346 0
-2342 -2343  2344 -394  2347 0

c  -1+1 --> 0
c    ( b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0 ∧  p_394) -> (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧ -b^{1, 395}_0)
c  in CNF:
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_2
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_1
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_0
c  in DIMACS:
-2342  2343 -2344 -394 -2345 0
-2342  2343 -2344 -394 -2346 0
-2342  2343 -2344 -394 -2347 0

c  0+1 --> 1
c    (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧  p_394) -> (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0)
c  in CNF:
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_2
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_1
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨  b^{1, 395}_0
c  in DIMACS:
 2342  2343  2344 -394 -2345 0
 2342  2343  2344 -394 -2346 0
 2342  2343  2344 -394  2347 0

c  1+1 --> 2
c    (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0 ∧  p_394) -> (-b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0)
c  in CNF:
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_2
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨  b^{1, 395}_1
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ -p_394 ∨ -b^{1, 395}_0
c  in DIMACS:
 2342  2343 -2344 -394 -2345 0
 2342  2343 -2344 -394  2346 0
 2342  2343 -2344 -394 -2347 0

c  2+1 --> break 
c    (-b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧  p_394) -> break
c  in CNF:
c     b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ -p_394 ∨ break
c  in DIMACS:
 2342 -2343  2344 -394 1162 0


c  2-1 --> 1
c    (-b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧ -p_394) -> (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0)
c  in CNF:
c     b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_2
c     b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_1
c     b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨  b^{1, 395}_0
c  in DIMACS:
 2342 -2343  2344  394 -2345 0
 2342 -2343  2344  394 -2346 0
 2342 -2343  2344  394  2347 0

c  1-1 --> 0
c    (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0 ∧ -p_394) -> (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧ -b^{1, 395}_0)
c  in CNF:
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_2
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_1
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_0
c  in DIMACS:
 2342  2343 -2344  394 -2345 0
 2342  2343 -2344  394 -2346 0
 2342  2343 -2344  394 -2347 0

c  0-1 --> -1
c    (-b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧ -p_394) -> ( b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0)
c  in CNF:
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨  b^{1, 395}_2
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_1
c     b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨  b^{1, 395}_0
c  in DIMACS:
 2342  2343  2344  394  2345 0
 2342  2343  2344  394 -2346 0
 2342  2343  2344  394  2347 0

c  -1-1 --> -2
c    ( b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧  b^{1, 394}_0 ∧ -p_394) -> ( b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0)
c  in CNF:
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨  b^{1, 395}_2
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨  b^{1, 395}_1
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨  p_394 ∨ -b^{1, 395}_0
c  in DIMACS:
-2342  2343 -2344  394  2345 0
-2342  2343 -2344  394  2346 0
-2342  2343 -2344  394 -2347 0

c  -2-1 --> break 
c    ( b^{1, 394}_2 ∧  b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧ -p_394) -> break
c  in CNF:
c    -b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨  b^{1, 394}_0 ∨  p_394 ∨ break
c  in DIMACS:
-2342 -2343  2344  394 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 394}_2 ∧ -b^{1, 394}_1 ∧ -b^{1, 394}_0 ∧ true) 
c  in CNF:
c    -b^{1, 394}_2 ∨  b^{1, 394}_1 ∨  b^{1, 394}_0 ∨ false 
c  in DIMACS:
-2342  2343  2344  0

c  3 does not represent an automaton state.
c    -(-b^{1, 394}_2 ∧  b^{1, 394}_1 ∧  b^{1, 394}_0 ∧ true) 
c  in CNF:
c     b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ false 
c  in DIMACS:
 2342 -2343 -2344  0
c  -3 does not represent an automaton state.
c    -( b^{1, 394}_2 ∧  b^{1, 394}_1 ∧  b^{1, 394}_0 ∧ true) 
c  in CNF:
c    -b^{1, 394}_2 ∨ -b^{1, 394}_1 ∨ -b^{1, 394}_0 ∨ false 
c  in DIMACS:
-2342 -2343 -2344  0

c i = 395
c  -2+1 --> -1
c    ( b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧  p_395) -> ( b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0)
c  in CNF:
c    -b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨  b^{1, 396}_2
c    -b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_1
c    -b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨  b^{1, 396}_0
c  in DIMACS:
-2345 -2346  2347 -395  2348 0
-2345 -2346  2347 -395 -2349 0
-2345 -2346  2347 -395  2350 0

c  -1+1 --> 0
c    ( b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0 ∧  p_395) -> (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧ -b^{1, 396}_0)
c  in CNF:
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_2
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_1
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_0
c  in DIMACS:
-2345  2346 -2347 -395 -2348 0
-2345  2346 -2347 -395 -2349 0
-2345  2346 -2347 -395 -2350 0

c  0+1 --> 1
c    (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧  p_395) -> (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0)
c  in CNF:
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_2
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_1
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨  b^{1, 396}_0
c  in DIMACS:
 2345  2346  2347 -395 -2348 0
 2345  2346  2347 -395 -2349 0
 2345  2346  2347 -395  2350 0

c  1+1 --> 2
c    (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0 ∧  p_395) -> (-b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0)
c  in CNF:
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_2
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨  b^{1, 396}_1
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ -p_395 ∨ -b^{1, 396}_0
c  in DIMACS:
 2345  2346 -2347 -395 -2348 0
 2345  2346 -2347 -395  2349 0
 2345  2346 -2347 -395 -2350 0

c  2+1 --> break 
c    (-b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧  p_395) -> break
c  in CNF:
c     b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ -p_395 ∨ break
c  in DIMACS:
 2345 -2346  2347 -395 1162 0


c  2-1 --> 1
c    (-b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧ -p_395) -> (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0)
c  in CNF:
c     b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_2
c     b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_1
c     b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨  b^{1, 396}_0
c  in DIMACS:
 2345 -2346  2347  395 -2348 0
 2345 -2346  2347  395 -2349 0
 2345 -2346  2347  395  2350 0

c  1-1 --> 0
c    (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0 ∧ -p_395) -> (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧ -b^{1, 396}_0)
c  in CNF:
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_2
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_1
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_0
c  in DIMACS:
 2345  2346 -2347  395 -2348 0
 2345  2346 -2347  395 -2349 0
 2345  2346 -2347  395 -2350 0

c  0-1 --> -1
c    (-b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧ -p_395) -> ( b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0)
c  in CNF:
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨  b^{1, 396}_2
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_1
c     b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨  b^{1, 396}_0
c  in DIMACS:
 2345  2346  2347  395  2348 0
 2345  2346  2347  395 -2349 0
 2345  2346  2347  395  2350 0

c  -1-1 --> -2
c    ( b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧  b^{1, 395}_0 ∧ -p_395) -> ( b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0)
c  in CNF:
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨  b^{1, 396}_2
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨  b^{1, 396}_1
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨  p_395 ∨ -b^{1, 396}_0
c  in DIMACS:
-2345  2346 -2347  395  2348 0
-2345  2346 -2347  395  2349 0
-2345  2346 -2347  395 -2350 0

c  -2-1 --> break 
c    ( b^{1, 395}_2 ∧  b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧ -p_395) -> break
c  in CNF:
c    -b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨  b^{1, 395}_0 ∨  p_395 ∨ break
c  in DIMACS:
-2345 -2346  2347  395 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 395}_2 ∧ -b^{1, 395}_1 ∧ -b^{1, 395}_0 ∧ true) 
c  in CNF:
c    -b^{1, 395}_2 ∨  b^{1, 395}_1 ∨  b^{1, 395}_0 ∨ false 
c  in DIMACS:
-2345  2346  2347  0

c  3 does not represent an automaton state.
c    -(-b^{1, 395}_2 ∧  b^{1, 395}_1 ∧  b^{1, 395}_0 ∧ true) 
c  in CNF:
c     b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ false 
c  in DIMACS:
 2345 -2346 -2347  0
c  -3 does not represent an automaton state.
c    -( b^{1, 395}_2 ∧  b^{1, 395}_1 ∧  b^{1, 395}_0 ∧ true) 
c  in CNF:
c    -b^{1, 395}_2 ∨ -b^{1, 395}_1 ∨ -b^{1, 395}_0 ∨ false 
c  in DIMACS:
-2345 -2346 -2347  0

c i = 396
c  -2+1 --> -1
c    ( b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧  p_396) -> ( b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0)
c  in CNF:
c    -b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨  b^{1, 397}_2
c    -b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_1
c    -b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨  b^{1, 397}_0
c  in DIMACS:
-2348 -2349  2350 -396  2351 0
-2348 -2349  2350 -396 -2352 0
-2348 -2349  2350 -396  2353 0

c  -1+1 --> 0
c    ( b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0 ∧  p_396) -> (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧ -b^{1, 397}_0)
c  in CNF:
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_2
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_1
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_0
c  in DIMACS:
-2348  2349 -2350 -396 -2351 0
-2348  2349 -2350 -396 -2352 0
-2348  2349 -2350 -396 -2353 0

c  0+1 --> 1
c    (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧  p_396) -> (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0)
c  in CNF:
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_2
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_1
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨  b^{1, 397}_0
c  in DIMACS:
 2348  2349  2350 -396 -2351 0
 2348  2349  2350 -396 -2352 0
 2348  2349  2350 -396  2353 0

c  1+1 --> 2
c    (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0 ∧  p_396) -> (-b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0)
c  in CNF:
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_2
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨  b^{1, 397}_1
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ -p_396 ∨ -b^{1, 397}_0
c  in DIMACS:
 2348  2349 -2350 -396 -2351 0
 2348  2349 -2350 -396  2352 0
 2348  2349 -2350 -396 -2353 0

c  2+1 --> break 
c    (-b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧  p_396) -> break
c  in CNF:
c     b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 2348 -2349  2350 -396 1162 0


c  2-1 --> 1
c    (-b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧ -p_396) -> (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0)
c  in CNF:
c     b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_2
c     b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_1
c     b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨  b^{1, 397}_0
c  in DIMACS:
 2348 -2349  2350  396 -2351 0
 2348 -2349  2350  396 -2352 0
 2348 -2349  2350  396  2353 0

c  1-1 --> 0
c    (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0 ∧ -p_396) -> (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧ -b^{1, 397}_0)
c  in CNF:
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_2
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_1
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_0
c  in DIMACS:
 2348  2349 -2350  396 -2351 0
 2348  2349 -2350  396 -2352 0
 2348  2349 -2350  396 -2353 0

c  0-1 --> -1
c    (-b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧ -p_396) -> ( b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0)
c  in CNF:
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨  b^{1, 397}_2
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_1
c     b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨  b^{1, 397}_0
c  in DIMACS:
 2348  2349  2350  396  2351 0
 2348  2349  2350  396 -2352 0
 2348  2349  2350  396  2353 0

c  -1-1 --> -2
c    ( b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧  b^{1, 396}_0 ∧ -p_396) -> ( b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0)
c  in CNF:
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨  b^{1, 397}_2
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨  b^{1, 397}_1
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨  p_396 ∨ -b^{1, 397}_0
c  in DIMACS:
-2348  2349 -2350  396  2351 0
-2348  2349 -2350  396  2352 0
-2348  2349 -2350  396 -2353 0

c  -2-1 --> break 
c    ( b^{1, 396}_2 ∧  b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨  b^{1, 396}_0 ∨  p_396 ∨ break
c  in DIMACS:
-2348 -2349  2350  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 396}_2 ∧ -b^{1, 396}_1 ∧ -b^{1, 396}_0 ∧ true) 
c  in CNF:
c    -b^{1, 396}_2 ∨  b^{1, 396}_1 ∨  b^{1, 396}_0 ∨ false 
c  in DIMACS:
-2348  2349  2350  0

c  3 does not represent an automaton state.
c    -(-b^{1, 396}_2 ∧  b^{1, 396}_1 ∧  b^{1, 396}_0 ∧ true) 
c  in CNF:
c     b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ false 
c  in DIMACS:
 2348 -2349 -2350  0
c  -3 does not represent an automaton state.
c    -( b^{1, 396}_2 ∧  b^{1, 396}_1 ∧  b^{1, 396}_0 ∧ true) 
c  in CNF:
c    -b^{1, 396}_2 ∨ -b^{1, 396}_1 ∨ -b^{1, 396}_0 ∨ false 
c  in DIMACS:
-2348 -2349 -2350  0

c i = 397
c  -2+1 --> -1
c    ( b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧  p_397) -> ( b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0)
c  in CNF:
c    -b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨  b^{1, 398}_2
c    -b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_1
c    -b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨  b^{1, 398}_0
c  in DIMACS:
-2351 -2352  2353 -397  2354 0
-2351 -2352  2353 -397 -2355 0
-2351 -2352  2353 -397  2356 0

c  -1+1 --> 0
c    ( b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0 ∧  p_397) -> (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧ -b^{1, 398}_0)
c  in CNF:
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_2
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_1
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_0
c  in DIMACS:
-2351  2352 -2353 -397 -2354 0
-2351  2352 -2353 -397 -2355 0
-2351  2352 -2353 -397 -2356 0

c  0+1 --> 1
c    (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧  p_397) -> (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0)
c  in CNF:
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_2
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_1
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨  b^{1, 398}_0
c  in DIMACS:
 2351  2352  2353 -397 -2354 0
 2351  2352  2353 -397 -2355 0
 2351  2352  2353 -397  2356 0

c  1+1 --> 2
c    (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0 ∧  p_397) -> (-b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0)
c  in CNF:
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_2
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨  b^{1, 398}_1
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ -p_397 ∨ -b^{1, 398}_0
c  in DIMACS:
 2351  2352 -2353 -397 -2354 0
 2351  2352 -2353 -397  2355 0
 2351  2352 -2353 -397 -2356 0

c  2+1 --> break 
c    (-b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧  p_397) -> break
c  in CNF:
c     b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ -p_397 ∨ break
c  in DIMACS:
 2351 -2352  2353 -397 1162 0


c  2-1 --> 1
c    (-b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧ -p_397) -> (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0)
c  in CNF:
c     b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_2
c     b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_1
c     b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨  b^{1, 398}_0
c  in DIMACS:
 2351 -2352  2353  397 -2354 0
 2351 -2352  2353  397 -2355 0
 2351 -2352  2353  397  2356 0

c  1-1 --> 0
c    (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0 ∧ -p_397) -> (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧ -b^{1, 398}_0)
c  in CNF:
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_2
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_1
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_0
c  in DIMACS:
 2351  2352 -2353  397 -2354 0
 2351  2352 -2353  397 -2355 0
 2351  2352 -2353  397 -2356 0

c  0-1 --> -1
c    (-b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧ -p_397) -> ( b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0)
c  in CNF:
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨  b^{1, 398}_2
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_1
c     b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨  b^{1, 398}_0
c  in DIMACS:
 2351  2352  2353  397  2354 0
 2351  2352  2353  397 -2355 0
 2351  2352  2353  397  2356 0

c  -1-1 --> -2
c    ( b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧  b^{1, 397}_0 ∧ -p_397) -> ( b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0)
c  in CNF:
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨  b^{1, 398}_2
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨  b^{1, 398}_1
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨  p_397 ∨ -b^{1, 398}_0
c  in DIMACS:
-2351  2352 -2353  397  2354 0
-2351  2352 -2353  397  2355 0
-2351  2352 -2353  397 -2356 0

c  -2-1 --> break 
c    ( b^{1, 397}_2 ∧  b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧ -p_397) -> break
c  in CNF:
c    -b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨  b^{1, 397}_0 ∨  p_397 ∨ break
c  in DIMACS:
-2351 -2352  2353  397 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 397}_2 ∧ -b^{1, 397}_1 ∧ -b^{1, 397}_0 ∧ true) 
c  in CNF:
c    -b^{1, 397}_2 ∨  b^{1, 397}_1 ∨  b^{1, 397}_0 ∨ false 
c  in DIMACS:
-2351  2352  2353  0

c  3 does not represent an automaton state.
c    -(-b^{1, 397}_2 ∧  b^{1, 397}_1 ∧  b^{1, 397}_0 ∧ true) 
c  in CNF:
c     b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ false 
c  in DIMACS:
 2351 -2352 -2353  0
c  -3 does not represent an automaton state.
c    -( b^{1, 397}_2 ∧  b^{1, 397}_1 ∧  b^{1, 397}_0 ∧ true) 
c  in CNF:
c    -b^{1, 397}_2 ∨ -b^{1, 397}_1 ∨ -b^{1, 397}_0 ∨ false 
c  in DIMACS:
-2351 -2352 -2353  0

c i = 398
c  -2+1 --> -1
c    ( b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧  p_398) -> ( b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0)
c  in CNF:
c    -b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨  b^{1, 399}_2
c    -b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_1
c    -b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨  b^{1, 399}_0
c  in DIMACS:
-2354 -2355  2356 -398  2357 0
-2354 -2355  2356 -398 -2358 0
-2354 -2355  2356 -398  2359 0

c  -1+1 --> 0
c    ( b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0 ∧  p_398) -> (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧ -b^{1, 399}_0)
c  in CNF:
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_2
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_1
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_0
c  in DIMACS:
-2354  2355 -2356 -398 -2357 0
-2354  2355 -2356 -398 -2358 0
-2354  2355 -2356 -398 -2359 0

c  0+1 --> 1
c    (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧  p_398) -> (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0)
c  in CNF:
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_2
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_1
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨  b^{1, 399}_0
c  in DIMACS:
 2354  2355  2356 -398 -2357 0
 2354  2355  2356 -398 -2358 0
 2354  2355  2356 -398  2359 0

c  1+1 --> 2
c    (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0 ∧  p_398) -> (-b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0)
c  in CNF:
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_2
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨  b^{1, 399}_1
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ -p_398 ∨ -b^{1, 399}_0
c  in DIMACS:
 2354  2355 -2356 -398 -2357 0
 2354  2355 -2356 -398  2358 0
 2354  2355 -2356 -398 -2359 0

c  2+1 --> break 
c    (-b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧  p_398) -> break
c  in CNF:
c     b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ -p_398 ∨ break
c  in DIMACS:
 2354 -2355  2356 -398 1162 0


c  2-1 --> 1
c    (-b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧ -p_398) -> (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0)
c  in CNF:
c     b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_2
c     b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_1
c     b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨  b^{1, 399}_0
c  in DIMACS:
 2354 -2355  2356  398 -2357 0
 2354 -2355  2356  398 -2358 0
 2354 -2355  2356  398  2359 0

c  1-1 --> 0
c    (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0 ∧ -p_398) -> (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧ -b^{1, 399}_0)
c  in CNF:
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_2
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_1
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_0
c  in DIMACS:
 2354  2355 -2356  398 -2357 0
 2354  2355 -2356  398 -2358 0
 2354  2355 -2356  398 -2359 0

c  0-1 --> -1
c    (-b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧ -p_398) -> ( b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0)
c  in CNF:
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨  b^{1, 399}_2
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_1
c     b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨  b^{1, 399}_0
c  in DIMACS:
 2354  2355  2356  398  2357 0
 2354  2355  2356  398 -2358 0
 2354  2355  2356  398  2359 0

c  -1-1 --> -2
c    ( b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧  b^{1, 398}_0 ∧ -p_398) -> ( b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0)
c  in CNF:
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨  b^{1, 399}_2
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨  b^{1, 399}_1
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨  p_398 ∨ -b^{1, 399}_0
c  in DIMACS:
-2354  2355 -2356  398  2357 0
-2354  2355 -2356  398  2358 0
-2354  2355 -2356  398 -2359 0

c  -2-1 --> break 
c    ( b^{1, 398}_2 ∧  b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧ -p_398) -> break
c  in CNF:
c    -b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨  b^{1, 398}_0 ∨  p_398 ∨ break
c  in DIMACS:
-2354 -2355  2356  398 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 398}_2 ∧ -b^{1, 398}_1 ∧ -b^{1, 398}_0 ∧ true) 
c  in CNF:
c    -b^{1, 398}_2 ∨  b^{1, 398}_1 ∨  b^{1, 398}_0 ∨ false 
c  in DIMACS:
-2354  2355  2356  0

c  3 does not represent an automaton state.
c    -(-b^{1, 398}_2 ∧  b^{1, 398}_1 ∧  b^{1, 398}_0 ∧ true) 
c  in CNF:
c     b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ false 
c  in DIMACS:
 2354 -2355 -2356  0
c  -3 does not represent an automaton state.
c    -( b^{1, 398}_2 ∧  b^{1, 398}_1 ∧  b^{1, 398}_0 ∧ true) 
c  in CNF:
c    -b^{1, 398}_2 ∨ -b^{1, 398}_1 ∨ -b^{1, 398}_0 ∨ false 
c  in DIMACS:
-2354 -2355 -2356  0

c i = 399
c  -2+1 --> -1
c    ( b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧  p_399) -> ( b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0)
c  in CNF:
c    -b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨  b^{1, 400}_2
c    -b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_1
c    -b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨  b^{1, 400}_0
c  in DIMACS:
-2357 -2358  2359 -399  2360 0
-2357 -2358  2359 -399 -2361 0
-2357 -2358  2359 -399  2362 0

c  -1+1 --> 0
c    ( b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0 ∧  p_399) -> (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧ -b^{1, 400}_0)
c  in CNF:
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_2
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_1
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_0
c  in DIMACS:
-2357  2358 -2359 -399 -2360 0
-2357  2358 -2359 -399 -2361 0
-2357  2358 -2359 -399 -2362 0

c  0+1 --> 1
c    (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧  p_399) -> (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0)
c  in CNF:
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_2
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_1
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨  b^{1, 400}_0
c  in DIMACS:
 2357  2358  2359 -399 -2360 0
 2357  2358  2359 -399 -2361 0
 2357  2358  2359 -399  2362 0

c  1+1 --> 2
c    (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0 ∧  p_399) -> (-b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0)
c  in CNF:
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_2
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨  b^{1, 400}_1
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ -p_399 ∨ -b^{1, 400}_0
c  in DIMACS:
 2357  2358 -2359 -399 -2360 0
 2357  2358 -2359 -399  2361 0
 2357  2358 -2359 -399 -2362 0

c  2+1 --> break 
c    (-b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧  p_399) -> break
c  in CNF:
c     b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 2357 -2358  2359 -399 1162 0


c  2-1 --> 1
c    (-b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧ -p_399) -> (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0)
c  in CNF:
c     b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_2
c     b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_1
c     b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨  b^{1, 400}_0
c  in DIMACS:
 2357 -2358  2359  399 -2360 0
 2357 -2358  2359  399 -2361 0
 2357 -2358  2359  399  2362 0

c  1-1 --> 0
c    (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0 ∧ -p_399) -> (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧ -b^{1, 400}_0)
c  in CNF:
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_2
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_1
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_0
c  in DIMACS:
 2357  2358 -2359  399 -2360 0
 2357  2358 -2359  399 -2361 0
 2357  2358 -2359  399 -2362 0

c  0-1 --> -1
c    (-b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧ -p_399) -> ( b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0)
c  in CNF:
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨  b^{1, 400}_2
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_1
c     b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨  b^{1, 400}_0
c  in DIMACS:
 2357  2358  2359  399  2360 0
 2357  2358  2359  399 -2361 0
 2357  2358  2359  399  2362 0

c  -1-1 --> -2
c    ( b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧  b^{1, 399}_0 ∧ -p_399) -> ( b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0)
c  in CNF:
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨  b^{1, 400}_2
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨  b^{1, 400}_1
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨  p_399 ∨ -b^{1, 400}_0
c  in DIMACS:
-2357  2358 -2359  399  2360 0
-2357  2358 -2359  399  2361 0
-2357  2358 -2359  399 -2362 0

c  -2-1 --> break 
c    ( b^{1, 399}_2 ∧  b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨  b^{1, 399}_0 ∨  p_399 ∨ break
c  in DIMACS:
-2357 -2358  2359  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 399}_2 ∧ -b^{1, 399}_1 ∧ -b^{1, 399}_0 ∧ true) 
c  in CNF:
c    -b^{1, 399}_2 ∨  b^{1, 399}_1 ∨  b^{1, 399}_0 ∨ false 
c  in DIMACS:
-2357  2358  2359  0

c  3 does not represent an automaton state.
c    -(-b^{1, 399}_2 ∧  b^{1, 399}_1 ∧  b^{1, 399}_0 ∧ true) 
c  in CNF:
c     b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ false 
c  in DIMACS:
 2357 -2358 -2359  0
c  -3 does not represent an automaton state.
c    -( b^{1, 399}_2 ∧  b^{1, 399}_1 ∧  b^{1, 399}_0 ∧ true) 
c  in CNF:
c    -b^{1, 399}_2 ∨ -b^{1, 399}_1 ∨ -b^{1, 399}_0 ∨ false 
c  in DIMACS:
-2357 -2358 -2359  0

c i = 400
c  -2+1 --> -1
c    ( b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧  p_400) -> ( b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0)
c  in CNF:
c    -b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨  b^{1, 401}_2
c    -b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_1
c    -b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨  b^{1, 401}_0
c  in DIMACS:
-2360 -2361  2362 -400  2363 0
-2360 -2361  2362 -400 -2364 0
-2360 -2361  2362 -400  2365 0

c  -1+1 --> 0
c    ( b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0 ∧  p_400) -> (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧ -b^{1, 401}_0)
c  in CNF:
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_2
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_1
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_0
c  in DIMACS:
-2360  2361 -2362 -400 -2363 0
-2360  2361 -2362 -400 -2364 0
-2360  2361 -2362 -400 -2365 0

c  0+1 --> 1
c    (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧  p_400) -> (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0)
c  in CNF:
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_2
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_1
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨  b^{1, 401}_0
c  in DIMACS:
 2360  2361  2362 -400 -2363 0
 2360  2361  2362 -400 -2364 0
 2360  2361  2362 -400  2365 0

c  1+1 --> 2
c    (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0 ∧  p_400) -> (-b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0)
c  in CNF:
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_2
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨  b^{1, 401}_1
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ -p_400 ∨ -b^{1, 401}_0
c  in DIMACS:
 2360  2361 -2362 -400 -2363 0
 2360  2361 -2362 -400  2364 0
 2360  2361 -2362 -400 -2365 0

c  2+1 --> break 
c    (-b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧  p_400) -> break
c  in CNF:
c     b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 2360 -2361  2362 -400 1162 0


c  2-1 --> 1
c    (-b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧ -p_400) -> (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0)
c  in CNF:
c     b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_2
c     b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_1
c     b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨  b^{1, 401}_0
c  in DIMACS:
 2360 -2361  2362  400 -2363 0
 2360 -2361  2362  400 -2364 0
 2360 -2361  2362  400  2365 0

c  1-1 --> 0
c    (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0 ∧ -p_400) -> (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧ -b^{1, 401}_0)
c  in CNF:
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_2
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_1
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_0
c  in DIMACS:
 2360  2361 -2362  400 -2363 0
 2360  2361 -2362  400 -2364 0
 2360  2361 -2362  400 -2365 0

c  0-1 --> -1
c    (-b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧ -p_400) -> ( b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0)
c  in CNF:
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨  b^{1, 401}_2
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_1
c     b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨  b^{1, 401}_0
c  in DIMACS:
 2360  2361  2362  400  2363 0
 2360  2361  2362  400 -2364 0
 2360  2361  2362  400  2365 0

c  -1-1 --> -2
c    ( b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧  b^{1, 400}_0 ∧ -p_400) -> ( b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0)
c  in CNF:
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨  b^{1, 401}_2
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨  b^{1, 401}_1
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨  p_400 ∨ -b^{1, 401}_0
c  in DIMACS:
-2360  2361 -2362  400  2363 0
-2360  2361 -2362  400  2364 0
-2360  2361 -2362  400 -2365 0

c  -2-1 --> break 
c    ( b^{1, 400}_2 ∧  b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨  b^{1, 400}_0 ∨  p_400 ∨ break
c  in DIMACS:
-2360 -2361  2362  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 400}_2 ∧ -b^{1, 400}_1 ∧ -b^{1, 400}_0 ∧ true) 
c  in CNF:
c    -b^{1, 400}_2 ∨  b^{1, 400}_1 ∨  b^{1, 400}_0 ∨ false 
c  in DIMACS:
-2360  2361  2362  0

c  3 does not represent an automaton state.
c    -(-b^{1, 400}_2 ∧  b^{1, 400}_1 ∧  b^{1, 400}_0 ∧ true) 
c  in CNF:
c     b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ false 
c  in DIMACS:
 2360 -2361 -2362  0
c  -3 does not represent an automaton state.
c    -( b^{1, 400}_2 ∧  b^{1, 400}_1 ∧  b^{1, 400}_0 ∧ true) 
c  in CNF:
c    -b^{1, 400}_2 ∨ -b^{1, 400}_1 ∨ -b^{1, 400}_0 ∨ false 
c  in DIMACS:
-2360 -2361 -2362  0

c i = 401
c  -2+1 --> -1
c    ( b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧  p_401) -> ( b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0)
c  in CNF:
c    -b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨  b^{1, 402}_2
c    -b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_1
c    -b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨  b^{1, 402}_0
c  in DIMACS:
-2363 -2364  2365 -401  2366 0
-2363 -2364  2365 -401 -2367 0
-2363 -2364  2365 -401  2368 0

c  -1+1 --> 0
c    ( b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0 ∧  p_401) -> (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧ -b^{1, 402}_0)
c  in CNF:
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_2
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_1
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_0
c  in DIMACS:
-2363  2364 -2365 -401 -2366 0
-2363  2364 -2365 -401 -2367 0
-2363  2364 -2365 -401 -2368 0

c  0+1 --> 1
c    (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧  p_401) -> (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0)
c  in CNF:
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_2
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_1
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨  b^{1, 402}_0
c  in DIMACS:
 2363  2364  2365 -401 -2366 0
 2363  2364  2365 -401 -2367 0
 2363  2364  2365 -401  2368 0

c  1+1 --> 2
c    (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0 ∧  p_401) -> (-b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0)
c  in CNF:
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_2
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨  b^{1, 402}_1
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ -p_401 ∨ -b^{1, 402}_0
c  in DIMACS:
 2363  2364 -2365 -401 -2366 0
 2363  2364 -2365 -401  2367 0
 2363  2364 -2365 -401 -2368 0

c  2+1 --> break 
c    (-b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧  p_401) -> break
c  in CNF:
c     b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ -p_401 ∨ break
c  in DIMACS:
 2363 -2364  2365 -401 1162 0


c  2-1 --> 1
c    (-b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧ -p_401) -> (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0)
c  in CNF:
c     b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_2
c     b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_1
c     b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨  b^{1, 402}_0
c  in DIMACS:
 2363 -2364  2365  401 -2366 0
 2363 -2364  2365  401 -2367 0
 2363 -2364  2365  401  2368 0

c  1-1 --> 0
c    (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0 ∧ -p_401) -> (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧ -b^{1, 402}_0)
c  in CNF:
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_2
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_1
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_0
c  in DIMACS:
 2363  2364 -2365  401 -2366 0
 2363  2364 -2365  401 -2367 0
 2363  2364 -2365  401 -2368 0

c  0-1 --> -1
c    (-b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧ -p_401) -> ( b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0)
c  in CNF:
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨  b^{1, 402}_2
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_1
c     b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨  b^{1, 402}_0
c  in DIMACS:
 2363  2364  2365  401  2366 0
 2363  2364  2365  401 -2367 0
 2363  2364  2365  401  2368 0

c  -1-1 --> -2
c    ( b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧  b^{1, 401}_0 ∧ -p_401) -> ( b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0)
c  in CNF:
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨  b^{1, 402}_2
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨  b^{1, 402}_1
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨  p_401 ∨ -b^{1, 402}_0
c  in DIMACS:
-2363  2364 -2365  401  2366 0
-2363  2364 -2365  401  2367 0
-2363  2364 -2365  401 -2368 0

c  -2-1 --> break 
c    ( b^{1, 401}_2 ∧  b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧ -p_401) -> break
c  in CNF:
c    -b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨  b^{1, 401}_0 ∨  p_401 ∨ break
c  in DIMACS:
-2363 -2364  2365  401 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 401}_2 ∧ -b^{1, 401}_1 ∧ -b^{1, 401}_0 ∧ true) 
c  in CNF:
c    -b^{1, 401}_2 ∨  b^{1, 401}_1 ∨  b^{1, 401}_0 ∨ false 
c  in DIMACS:
-2363  2364  2365  0

c  3 does not represent an automaton state.
c    -(-b^{1, 401}_2 ∧  b^{1, 401}_1 ∧  b^{1, 401}_0 ∧ true) 
c  in CNF:
c     b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ false 
c  in DIMACS:
 2363 -2364 -2365  0
c  -3 does not represent an automaton state.
c    -( b^{1, 401}_2 ∧  b^{1, 401}_1 ∧  b^{1, 401}_0 ∧ true) 
c  in CNF:
c    -b^{1, 401}_2 ∨ -b^{1, 401}_1 ∨ -b^{1, 401}_0 ∨ false 
c  in DIMACS:
-2363 -2364 -2365  0

c i = 402
c  -2+1 --> -1
c    ( b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧  p_402) -> ( b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0)
c  in CNF:
c    -b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨  b^{1, 403}_2
c    -b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_1
c    -b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨  b^{1, 403}_0
c  in DIMACS:
-2366 -2367  2368 -402  2369 0
-2366 -2367  2368 -402 -2370 0
-2366 -2367  2368 -402  2371 0

c  -1+1 --> 0
c    ( b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0 ∧  p_402) -> (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧ -b^{1, 403}_0)
c  in CNF:
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_2
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_1
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_0
c  in DIMACS:
-2366  2367 -2368 -402 -2369 0
-2366  2367 -2368 -402 -2370 0
-2366  2367 -2368 -402 -2371 0

c  0+1 --> 1
c    (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧  p_402) -> (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0)
c  in CNF:
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_2
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_1
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨  b^{1, 403}_0
c  in DIMACS:
 2366  2367  2368 -402 -2369 0
 2366  2367  2368 -402 -2370 0
 2366  2367  2368 -402  2371 0

c  1+1 --> 2
c    (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0 ∧  p_402) -> (-b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0)
c  in CNF:
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_2
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨  b^{1, 403}_1
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ -p_402 ∨ -b^{1, 403}_0
c  in DIMACS:
 2366  2367 -2368 -402 -2369 0
 2366  2367 -2368 -402  2370 0
 2366  2367 -2368 -402 -2371 0

c  2+1 --> break 
c    (-b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧  p_402) -> break
c  in CNF:
c     b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 2366 -2367  2368 -402 1162 0


c  2-1 --> 1
c    (-b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧ -p_402) -> (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0)
c  in CNF:
c     b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_2
c     b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_1
c     b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨  b^{1, 403}_0
c  in DIMACS:
 2366 -2367  2368  402 -2369 0
 2366 -2367  2368  402 -2370 0
 2366 -2367  2368  402  2371 0

c  1-1 --> 0
c    (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0 ∧ -p_402) -> (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧ -b^{1, 403}_0)
c  in CNF:
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_2
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_1
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_0
c  in DIMACS:
 2366  2367 -2368  402 -2369 0
 2366  2367 -2368  402 -2370 0
 2366  2367 -2368  402 -2371 0

c  0-1 --> -1
c    (-b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧ -p_402) -> ( b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0)
c  in CNF:
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨  b^{1, 403}_2
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_1
c     b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨  b^{1, 403}_0
c  in DIMACS:
 2366  2367  2368  402  2369 0
 2366  2367  2368  402 -2370 0
 2366  2367  2368  402  2371 0

c  -1-1 --> -2
c    ( b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧  b^{1, 402}_0 ∧ -p_402) -> ( b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0)
c  in CNF:
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨  b^{1, 403}_2
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨  b^{1, 403}_1
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨  p_402 ∨ -b^{1, 403}_0
c  in DIMACS:
-2366  2367 -2368  402  2369 0
-2366  2367 -2368  402  2370 0
-2366  2367 -2368  402 -2371 0

c  -2-1 --> break 
c    ( b^{1, 402}_2 ∧  b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨  b^{1, 402}_0 ∨  p_402 ∨ break
c  in DIMACS:
-2366 -2367  2368  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 402}_2 ∧ -b^{1, 402}_1 ∧ -b^{1, 402}_0 ∧ true) 
c  in CNF:
c    -b^{1, 402}_2 ∨  b^{1, 402}_1 ∨  b^{1, 402}_0 ∨ false 
c  in DIMACS:
-2366  2367  2368  0

c  3 does not represent an automaton state.
c    -(-b^{1, 402}_2 ∧  b^{1, 402}_1 ∧  b^{1, 402}_0 ∧ true) 
c  in CNF:
c     b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ false 
c  in DIMACS:
 2366 -2367 -2368  0
c  -3 does not represent an automaton state.
c    -( b^{1, 402}_2 ∧  b^{1, 402}_1 ∧  b^{1, 402}_0 ∧ true) 
c  in CNF:
c    -b^{1, 402}_2 ∨ -b^{1, 402}_1 ∨ -b^{1, 402}_0 ∨ false 
c  in DIMACS:
-2366 -2367 -2368  0

c i = 403
c  -2+1 --> -1
c    ( b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧  p_403) -> ( b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0)
c  in CNF:
c    -b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨  b^{1, 404}_2
c    -b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_1
c    -b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨  b^{1, 404}_0
c  in DIMACS:
-2369 -2370  2371 -403  2372 0
-2369 -2370  2371 -403 -2373 0
-2369 -2370  2371 -403  2374 0

c  -1+1 --> 0
c    ( b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0 ∧  p_403) -> (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧ -b^{1, 404}_0)
c  in CNF:
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_2
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_1
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_0
c  in DIMACS:
-2369  2370 -2371 -403 -2372 0
-2369  2370 -2371 -403 -2373 0
-2369  2370 -2371 -403 -2374 0

c  0+1 --> 1
c    (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧  p_403) -> (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0)
c  in CNF:
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_2
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_1
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨  b^{1, 404}_0
c  in DIMACS:
 2369  2370  2371 -403 -2372 0
 2369  2370  2371 -403 -2373 0
 2369  2370  2371 -403  2374 0

c  1+1 --> 2
c    (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0 ∧  p_403) -> (-b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0)
c  in CNF:
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_2
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨  b^{1, 404}_1
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ -p_403 ∨ -b^{1, 404}_0
c  in DIMACS:
 2369  2370 -2371 -403 -2372 0
 2369  2370 -2371 -403  2373 0
 2369  2370 -2371 -403 -2374 0

c  2+1 --> break 
c    (-b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧  p_403) -> break
c  in CNF:
c     b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ -p_403 ∨ break
c  in DIMACS:
 2369 -2370  2371 -403 1162 0


c  2-1 --> 1
c    (-b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧ -p_403) -> (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0)
c  in CNF:
c     b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_2
c     b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_1
c     b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨  b^{1, 404}_0
c  in DIMACS:
 2369 -2370  2371  403 -2372 0
 2369 -2370  2371  403 -2373 0
 2369 -2370  2371  403  2374 0

c  1-1 --> 0
c    (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0 ∧ -p_403) -> (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧ -b^{1, 404}_0)
c  in CNF:
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_2
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_1
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_0
c  in DIMACS:
 2369  2370 -2371  403 -2372 0
 2369  2370 -2371  403 -2373 0
 2369  2370 -2371  403 -2374 0

c  0-1 --> -1
c    (-b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧ -p_403) -> ( b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0)
c  in CNF:
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨  b^{1, 404}_2
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_1
c     b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨  b^{1, 404}_0
c  in DIMACS:
 2369  2370  2371  403  2372 0
 2369  2370  2371  403 -2373 0
 2369  2370  2371  403  2374 0

c  -1-1 --> -2
c    ( b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧  b^{1, 403}_0 ∧ -p_403) -> ( b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0)
c  in CNF:
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨  b^{1, 404}_2
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨  b^{1, 404}_1
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨  p_403 ∨ -b^{1, 404}_0
c  in DIMACS:
-2369  2370 -2371  403  2372 0
-2369  2370 -2371  403  2373 0
-2369  2370 -2371  403 -2374 0

c  -2-1 --> break 
c    ( b^{1, 403}_2 ∧  b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧ -p_403) -> break
c  in CNF:
c    -b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨  b^{1, 403}_0 ∨  p_403 ∨ break
c  in DIMACS:
-2369 -2370  2371  403 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 403}_2 ∧ -b^{1, 403}_1 ∧ -b^{1, 403}_0 ∧ true) 
c  in CNF:
c    -b^{1, 403}_2 ∨  b^{1, 403}_1 ∨  b^{1, 403}_0 ∨ false 
c  in DIMACS:
-2369  2370  2371  0

c  3 does not represent an automaton state.
c    -(-b^{1, 403}_2 ∧  b^{1, 403}_1 ∧  b^{1, 403}_0 ∧ true) 
c  in CNF:
c     b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ false 
c  in DIMACS:
 2369 -2370 -2371  0
c  -3 does not represent an automaton state.
c    -( b^{1, 403}_2 ∧  b^{1, 403}_1 ∧  b^{1, 403}_0 ∧ true) 
c  in CNF:
c    -b^{1, 403}_2 ∨ -b^{1, 403}_1 ∨ -b^{1, 403}_0 ∨ false 
c  in DIMACS:
-2369 -2370 -2371  0

c i = 404
c  -2+1 --> -1
c    ( b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧  p_404) -> ( b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0)
c  in CNF:
c    -b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨  b^{1, 405}_2
c    -b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_1
c    -b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨  b^{1, 405}_0
c  in DIMACS:
-2372 -2373  2374 -404  2375 0
-2372 -2373  2374 -404 -2376 0
-2372 -2373  2374 -404  2377 0

c  -1+1 --> 0
c    ( b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0 ∧  p_404) -> (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧ -b^{1, 405}_0)
c  in CNF:
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_2
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_1
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_0
c  in DIMACS:
-2372  2373 -2374 -404 -2375 0
-2372  2373 -2374 -404 -2376 0
-2372  2373 -2374 -404 -2377 0

c  0+1 --> 1
c    (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧  p_404) -> (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0)
c  in CNF:
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_2
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_1
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨  b^{1, 405}_0
c  in DIMACS:
 2372  2373  2374 -404 -2375 0
 2372  2373  2374 -404 -2376 0
 2372  2373  2374 -404  2377 0

c  1+1 --> 2
c    (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0 ∧  p_404) -> (-b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0)
c  in CNF:
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_2
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨  b^{1, 405}_1
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ -p_404 ∨ -b^{1, 405}_0
c  in DIMACS:
 2372  2373 -2374 -404 -2375 0
 2372  2373 -2374 -404  2376 0
 2372  2373 -2374 -404 -2377 0

c  2+1 --> break 
c    (-b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧  p_404) -> break
c  in CNF:
c     b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ -p_404 ∨ break
c  in DIMACS:
 2372 -2373  2374 -404 1162 0


c  2-1 --> 1
c    (-b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧ -p_404) -> (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0)
c  in CNF:
c     b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_2
c     b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_1
c     b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨  b^{1, 405}_0
c  in DIMACS:
 2372 -2373  2374  404 -2375 0
 2372 -2373  2374  404 -2376 0
 2372 -2373  2374  404  2377 0

c  1-1 --> 0
c    (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0 ∧ -p_404) -> (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧ -b^{1, 405}_0)
c  in CNF:
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_2
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_1
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_0
c  in DIMACS:
 2372  2373 -2374  404 -2375 0
 2372  2373 -2374  404 -2376 0
 2372  2373 -2374  404 -2377 0

c  0-1 --> -1
c    (-b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧ -p_404) -> ( b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0)
c  in CNF:
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨  b^{1, 405}_2
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_1
c     b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨  b^{1, 405}_0
c  in DIMACS:
 2372  2373  2374  404  2375 0
 2372  2373  2374  404 -2376 0
 2372  2373  2374  404  2377 0

c  -1-1 --> -2
c    ( b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧  b^{1, 404}_0 ∧ -p_404) -> ( b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0)
c  in CNF:
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨  b^{1, 405}_2
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨  b^{1, 405}_1
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨  p_404 ∨ -b^{1, 405}_0
c  in DIMACS:
-2372  2373 -2374  404  2375 0
-2372  2373 -2374  404  2376 0
-2372  2373 -2374  404 -2377 0

c  -2-1 --> break 
c    ( b^{1, 404}_2 ∧  b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧ -p_404) -> break
c  in CNF:
c    -b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨  b^{1, 404}_0 ∨  p_404 ∨ break
c  in DIMACS:
-2372 -2373  2374  404 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 404}_2 ∧ -b^{1, 404}_1 ∧ -b^{1, 404}_0 ∧ true) 
c  in CNF:
c    -b^{1, 404}_2 ∨  b^{1, 404}_1 ∨  b^{1, 404}_0 ∨ false 
c  in DIMACS:
-2372  2373  2374  0

c  3 does not represent an automaton state.
c    -(-b^{1, 404}_2 ∧  b^{1, 404}_1 ∧  b^{1, 404}_0 ∧ true) 
c  in CNF:
c     b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ false 
c  in DIMACS:
 2372 -2373 -2374  0
c  -3 does not represent an automaton state.
c    -( b^{1, 404}_2 ∧  b^{1, 404}_1 ∧  b^{1, 404}_0 ∧ true) 
c  in CNF:
c    -b^{1, 404}_2 ∨ -b^{1, 404}_1 ∨ -b^{1, 404}_0 ∨ false 
c  in DIMACS:
-2372 -2373 -2374  0

c i = 405
c  -2+1 --> -1
c    ( b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧  p_405) -> ( b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0)
c  in CNF:
c    -b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨  b^{1, 406}_2
c    -b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_1
c    -b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨  b^{1, 406}_0
c  in DIMACS:
-2375 -2376  2377 -405  2378 0
-2375 -2376  2377 -405 -2379 0
-2375 -2376  2377 -405  2380 0

c  -1+1 --> 0
c    ( b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0 ∧  p_405) -> (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧ -b^{1, 406}_0)
c  in CNF:
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_2
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_1
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_0
c  in DIMACS:
-2375  2376 -2377 -405 -2378 0
-2375  2376 -2377 -405 -2379 0
-2375  2376 -2377 -405 -2380 0

c  0+1 --> 1
c    (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧  p_405) -> (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0)
c  in CNF:
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_2
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_1
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨  b^{1, 406}_0
c  in DIMACS:
 2375  2376  2377 -405 -2378 0
 2375  2376  2377 -405 -2379 0
 2375  2376  2377 -405  2380 0

c  1+1 --> 2
c    (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0 ∧  p_405) -> (-b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0)
c  in CNF:
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_2
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨  b^{1, 406}_1
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ -p_405 ∨ -b^{1, 406}_0
c  in DIMACS:
 2375  2376 -2377 -405 -2378 0
 2375  2376 -2377 -405  2379 0
 2375  2376 -2377 -405 -2380 0

c  2+1 --> break 
c    (-b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧  p_405) -> break
c  in CNF:
c     b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 2375 -2376  2377 -405 1162 0


c  2-1 --> 1
c    (-b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧ -p_405) -> (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0)
c  in CNF:
c     b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_2
c     b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_1
c     b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨  b^{1, 406}_0
c  in DIMACS:
 2375 -2376  2377  405 -2378 0
 2375 -2376  2377  405 -2379 0
 2375 -2376  2377  405  2380 0

c  1-1 --> 0
c    (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0 ∧ -p_405) -> (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧ -b^{1, 406}_0)
c  in CNF:
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_2
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_1
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_0
c  in DIMACS:
 2375  2376 -2377  405 -2378 0
 2375  2376 -2377  405 -2379 0
 2375  2376 -2377  405 -2380 0

c  0-1 --> -1
c    (-b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧ -p_405) -> ( b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0)
c  in CNF:
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨  b^{1, 406}_2
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_1
c     b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨  b^{1, 406}_0
c  in DIMACS:
 2375  2376  2377  405  2378 0
 2375  2376  2377  405 -2379 0
 2375  2376  2377  405  2380 0

c  -1-1 --> -2
c    ( b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧  b^{1, 405}_0 ∧ -p_405) -> ( b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0)
c  in CNF:
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨  b^{1, 406}_2
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨  b^{1, 406}_1
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨  p_405 ∨ -b^{1, 406}_0
c  in DIMACS:
-2375  2376 -2377  405  2378 0
-2375  2376 -2377  405  2379 0
-2375  2376 -2377  405 -2380 0

c  -2-1 --> break 
c    ( b^{1, 405}_2 ∧  b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨  b^{1, 405}_0 ∨  p_405 ∨ break
c  in DIMACS:
-2375 -2376  2377  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 405}_2 ∧ -b^{1, 405}_1 ∧ -b^{1, 405}_0 ∧ true) 
c  in CNF:
c    -b^{1, 405}_2 ∨  b^{1, 405}_1 ∨  b^{1, 405}_0 ∨ false 
c  in DIMACS:
-2375  2376  2377  0

c  3 does not represent an automaton state.
c    -(-b^{1, 405}_2 ∧  b^{1, 405}_1 ∧  b^{1, 405}_0 ∧ true) 
c  in CNF:
c     b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ false 
c  in DIMACS:
 2375 -2376 -2377  0
c  -3 does not represent an automaton state.
c    -( b^{1, 405}_2 ∧  b^{1, 405}_1 ∧  b^{1, 405}_0 ∧ true) 
c  in CNF:
c    -b^{1, 405}_2 ∨ -b^{1, 405}_1 ∨ -b^{1, 405}_0 ∨ false 
c  in DIMACS:
-2375 -2376 -2377  0

c i = 406
c  -2+1 --> -1
c    ( b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧  p_406) -> ( b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0)
c  in CNF:
c    -b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨  b^{1, 407}_2
c    -b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_1
c    -b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨  b^{1, 407}_0
c  in DIMACS:
-2378 -2379  2380 -406  2381 0
-2378 -2379  2380 -406 -2382 0
-2378 -2379  2380 -406  2383 0

c  -1+1 --> 0
c    ( b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0 ∧  p_406) -> (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧ -b^{1, 407}_0)
c  in CNF:
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_2
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_1
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_0
c  in DIMACS:
-2378  2379 -2380 -406 -2381 0
-2378  2379 -2380 -406 -2382 0
-2378  2379 -2380 -406 -2383 0

c  0+1 --> 1
c    (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧  p_406) -> (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0)
c  in CNF:
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_2
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_1
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨  b^{1, 407}_0
c  in DIMACS:
 2378  2379  2380 -406 -2381 0
 2378  2379  2380 -406 -2382 0
 2378  2379  2380 -406  2383 0

c  1+1 --> 2
c    (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0 ∧  p_406) -> (-b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0)
c  in CNF:
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_2
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨  b^{1, 407}_1
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ -p_406 ∨ -b^{1, 407}_0
c  in DIMACS:
 2378  2379 -2380 -406 -2381 0
 2378  2379 -2380 -406  2382 0
 2378  2379 -2380 -406 -2383 0

c  2+1 --> break 
c    (-b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧  p_406) -> break
c  in CNF:
c     b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 2378 -2379  2380 -406 1162 0


c  2-1 --> 1
c    (-b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧ -p_406) -> (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0)
c  in CNF:
c     b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_2
c     b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_1
c     b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨  b^{1, 407}_0
c  in DIMACS:
 2378 -2379  2380  406 -2381 0
 2378 -2379  2380  406 -2382 0
 2378 -2379  2380  406  2383 0

c  1-1 --> 0
c    (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0 ∧ -p_406) -> (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧ -b^{1, 407}_0)
c  in CNF:
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_2
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_1
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_0
c  in DIMACS:
 2378  2379 -2380  406 -2381 0
 2378  2379 -2380  406 -2382 0
 2378  2379 -2380  406 -2383 0

c  0-1 --> -1
c    (-b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧ -p_406) -> ( b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0)
c  in CNF:
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨  b^{1, 407}_2
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_1
c     b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨  b^{1, 407}_0
c  in DIMACS:
 2378  2379  2380  406  2381 0
 2378  2379  2380  406 -2382 0
 2378  2379  2380  406  2383 0

c  -1-1 --> -2
c    ( b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧  b^{1, 406}_0 ∧ -p_406) -> ( b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0)
c  in CNF:
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨  b^{1, 407}_2
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨  b^{1, 407}_1
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨  p_406 ∨ -b^{1, 407}_0
c  in DIMACS:
-2378  2379 -2380  406  2381 0
-2378  2379 -2380  406  2382 0
-2378  2379 -2380  406 -2383 0

c  -2-1 --> break 
c    ( b^{1, 406}_2 ∧  b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨  b^{1, 406}_0 ∨  p_406 ∨ break
c  in DIMACS:
-2378 -2379  2380  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 406}_2 ∧ -b^{1, 406}_1 ∧ -b^{1, 406}_0 ∧ true) 
c  in CNF:
c    -b^{1, 406}_2 ∨  b^{1, 406}_1 ∨  b^{1, 406}_0 ∨ false 
c  in DIMACS:
-2378  2379  2380  0

c  3 does not represent an automaton state.
c    -(-b^{1, 406}_2 ∧  b^{1, 406}_1 ∧  b^{1, 406}_0 ∧ true) 
c  in CNF:
c     b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ false 
c  in DIMACS:
 2378 -2379 -2380  0
c  -3 does not represent an automaton state.
c    -( b^{1, 406}_2 ∧  b^{1, 406}_1 ∧  b^{1, 406}_0 ∧ true) 
c  in CNF:
c    -b^{1, 406}_2 ∨ -b^{1, 406}_1 ∨ -b^{1, 406}_0 ∨ false 
c  in DIMACS:
-2378 -2379 -2380  0

c i = 407
c  -2+1 --> -1
c    ( b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧  p_407) -> ( b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0)
c  in CNF:
c    -b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨  b^{1, 408}_2
c    -b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_1
c    -b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨  b^{1, 408}_0
c  in DIMACS:
-2381 -2382  2383 -407  2384 0
-2381 -2382  2383 -407 -2385 0
-2381 -2382  2383 -407  2386 0

c  -1+1 --> 0
c    ( b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0 ∧  p_407) -> (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧ -b^{1, 408}_0)
c  in CNF:
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_2
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_1
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_0
c  in DIMACS:
-2381  2382 -2383 -407 -2384 0
-2381  2382 -2383 -407 -2385 0
-2381  2382 -2383 -407 -2386 0

c  0+1 --> 1
c    (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧  p_407) -> (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0)
c  in CNF:
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_2
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_1
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨  b^{1, 408}_0
c  in DIMACS:
 2381  2382  2383 -407 -2384 0
 2381  2382  2383 -407 -2385 0
 2381  2382  2383 -407  2386 0

c  1+1 --> 2
c    (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0 ∧  p_407) -> (-b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0)
c  in CNF:
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_2
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨  b^{1, 408}_1
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ -p_407 ∨ -b^{1, 408}_0
c  in DIMACS:
 2381  2382 -2383 -407 -2384 0
 2381  2382 -2383 -407  2385 0
 2381  2382 -2383 -407 -2386 0

c  2+1 --> break 
c    (-b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧  p_407) -> break
c  in CNF:
c     b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ -p_407 ∨ break
c  in DIMACS:
 2381 -2382  2383 -407 1162 0


c  2-1 --> 1
c    (-b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧ -p_407) -> (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0)
c  in CNF:
c     b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_2
c     b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_1
c     b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨  b^{1, 408}_0
c  in DIMACS:
 2381 -2382  2383  407 -2384 0
 2381 -2382  2383  407 -2385 0
 2381 -2382  2383  407  2386 0

c  1-1 --> 0
c    (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0 ∧ -p_407) -> (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧ -b^{1, 408}_0)
c  in CNF:
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_2
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_1
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_0
c  in DIMACS:
 2381  2382 -2383  407 -2384 0
 2381  2382 -2383  407 -2385 0
 2381  2382 -2383  407 -2386 0

c  0-1 --> -1
c    (-b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧ -p_407) -> ( b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0)
c  in CNF:
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨  b^{1, 408}_2
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_1
c     b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨  b^{1, 408}_0
c  in DIMACS:
 2381  2382  2383  407  2384 0
 2381  2382  2383  407 -2385 0
 2381  2382  2383  407  2386 0

c  -1-1 --> -2
c    ( b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧  b^{1, 407}_0 ∧ -p_407) -> ( b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0)
c  in CNF:
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨  b^{1, 408}_2
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨  b^{1, 408}_1
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨  p_407 ∨ -b^{1, 408}_0
c  in DIMACS:
-2381  2382 -2383  407  2384 0
-2381  2382 -2383  407  2385 0
-2381  2382 -2383  407 -2386 0

c  -2-1 --> break 
c    ( b^{1, 407}_2 ∧  b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧ -p_407) -> break
c  in CNF:
c    -b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨  b^{1, 407}_0 ∨  p_407 ∨ break
c  in DIMACS:
-2381 -2382  2383  407 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 407}_2 ∧ -b^{1, 407}_1 ∧ -b^{1, 407}_0 ∧ true) 
c  in CNF:
c    -b^{1, 407}_2 ∨  b^{1, 407}_1 ∨  b^{1, 407}_0 ∨ false 
c  in DIMACS:
-2381  2382  2383  0

c  3 does not represent an automaton state.
c    -(-b^{1, 407}_2 ∧  b^{1, 407}_1 ∧  b^{1, 407}_0 ∧ true) 
c  in CNF:
c     b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ false 
c  in DIMACS:
 2381 -2382 -2383  0
c  -3 does not represent an automaton state.
c    -( b^{1, 407}_2 ∧  b^{1, 407}_1 ∧  b^{1, 407}_0 ∧ true) 
c  in CNF:
c    -b^{1, 407}_2 ∨ -b^{1, 407}_1 ∨ -b^{1, 407}_0 ∨ false 
c  in DIMACS:
-2381 -2382 -2383  0

c i = 408
c  -2+1 --> -1
c    ( b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧  p_408) -> ( b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0)
c  in CNF:
c    -b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨  b^{1, 409}_2
c    -b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_1
c    -b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨  b^{1, 409}_0
c  in DIMACS:
-2384 -2385  2386 -408  2387 0
-2384 -2385  2386 -408 -2388 0
-2384 -2385  2386 -408  2389 0

c  -1+1 --> 0
c    ( b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0 ∧  p_408) -> (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧ -b^{1, 409}_0)
c  in CNF:
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_2
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_1
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_0
c  in DIMACS:
-2384  2385 -2386 -408 -2387 0
-2384  2385 -2386 -408 -2388 0
-2384  2385 -2386 -408 -2389 0

c  0+1 --> 1
c    (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧  p_408) -> (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0)
c  in CNF:
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_2
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_1
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨  b^{1, 409}_0
c  in DIMACS:
 2384  2385  2386 -408 -2387 0
 2384  2385  2386 -408 -2388 0
 2384  2385  2386 -408  2389 0

c  1+1 --> 2
c    (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0 ∧  p_408) -> (-b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0)
c  in CNF:
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_2
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨  b^{1, 409}_1
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ -p_408 ∨ -b^{1, 409}_0
c  in DIMACS:
 2384  2385 -2386 -408 -2387 0
 2384  2385 -2386 -408  2388 0
 2384  2385 -2386 -408 -2389 0

c  2+1 --> break 
c    (-b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧  p_408) -> break
c  in CNF:
c     b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 2384 -2385  2386 -408 1162 0


c  2-1 --> 1
c    (-b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧ -p_408) -> (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0)
c  in CNF:
c     b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_2
c     b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_1
c     b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨  b^{1, 409}_0
c  in DIMACS:
 2384 -2385  2386  408 -2387 0
 2384 -2385  2386  408 -2388 0
 2384 -2385  2386  408  2389 0

c  1-1 --> 0
c    (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0 ∧ -p_408) -> (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧ -b^{1, 409}_0)
c  in CNF:
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_2
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_1
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_0
c  in DIMACS:
 2384  2385 -2386  408 -2387 0
 2384  2385 -2386  408 -2388 0
 2384  2385 -2386  408 -2389 0

c  0-1 --> -1
c    (-b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧ -p_408) -> ( b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0)
c  in CNF:
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨  b^{1, 409}_2
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_1
c     b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨  b^{1, 409}_0
c  in DIMACS:
 2384  2385  2386  408  2387 0
 2384  2385  2386  408 -2388 0
 2384  2385  2386  408  2389 0

c  -1-1 --> -2
c    ( b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧  b^{1, 408}_0 ∧ -p_408) -> ( b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0)
c  in CNF:
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨  b^{1, 409}_2
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨  b^{1, 409}_1
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨  p_408 ∨ -b^{1, 409}_0
c  in DIMACS:
-2384  2385 -2386  408  2387 0
-2384  2385 -2386  408  2388 0
-2384  2385 -2386  408 -2389 0

c  -2-1 --> break 
c    ( b^{1, 408}_2 ∧  b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨  b^{1, 408}_0 ∨  p_408 ∨ break
c  in DIMACS:
-2384 -2385  2386  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 408}_2 ∧ -b^{1, 408}_1 ∧ -b^{1, 408}_0 ∧ true) 
c  in CNF:
c    -b^{1, 408}_2 ∨  b^{1, 408}_1 ∨  b^{1, 408}_0 ∨ false 
c  in DIMACS:
-2384  2385  2386  0

c  3 does not represent an automaton state.
c    -(-b^{1, 408}_2 ∧  b^{1, 408}_1 ∧  b^{1, 408}_0 ∧ true) 
c  in CNF:
c     b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ false 
c  in DIMACS:
 2384 -2385 -2386  0
c  -3 does not represent an automaton state.
c    -( b^{1, 408}_2 ∧  b^{1, 408}_1 ∧  b^{1, 408}_0 ∧ true) 
c  in CNF:
c    -b^{1, 408}_2 ∨ -b^{1, 408}_1 ∨ -b^{1, 408}_0 ∨ false 
c  in DIMACS:
-2384 -2385 -2386  0

c i = 409
c  -2+1 --> -1
c    ( b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧  p_409) -> ( b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0)
c  in CNF:
c    -b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨  b^{1, 410}_2
c    -b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_1
c    -b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨  b^{1, 410}_0
c  in DIMACS:
-2387 -2388  2389 -409  2390 0
-2387 -2388  2389 -409 -2391 0
-2387 -2388  2389 -409  2392 0

c  -1+1 --> 0
c    ( b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0 ∧  p_409) -> (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧ -b^{1, 410}_0)
c  in CNF:
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_2
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_1
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_0
c  in DIMACS:
-2387  2388 -2389 -409 -2390 0
-2387  2388 -2389 -409 -2391 0
-2387  2388 -2389 -409 -2392 0

c  0+1 --> 1
c    (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧  p_409) -> (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0)
c  in CNF:
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_2
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_1
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨  b^{1, 410}_0
c  in DIMACS:
 2387  2388  2389 -409 -2390 0
 2387  2388  2389 -409 -2391 0
 2387  2388  2389 -409  2392 0

c  1+1 --> 2
c    (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0 ∧  p_409) -> (-b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0)
c  in CNF:
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_2
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨  b^{1, 410}_1
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ -p_409 ∨ -b^{1, 410}_0
c  in DIMACS:
 2387  2388 -2389 -409 -2390 0
 2387  2388 -2389 -409  2391 0
 2387  2388 -2389 -409 -2392 0

c  2+1 --> break 
c    (-b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧  p_409) -> break
c  in CNF:
c     b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ -p_409 ∨ break
c  in DIMACS:
 2387 -2388  2389 -409 1162 0


c  2-1 --> 1
c    (-b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧ -p_409) -> (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0)
c  in CNF:
c     b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_2
c     b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_1
c     b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨  b^{1, 410}_0
c  in DIMACS:
 2387 -2388  2389  409 -2390 0
 2387 -2388  2389  409 -2391 0
 2387 -2388  2389  409  2392 0

c  1-1 --> 0
c    (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0 ∧ -p_409) -> (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧ -b^{1, 410}_0)
c  in CNF:
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_2
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_1
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_0
c  in DIMACS:
 2387  2388 -2389  409 -2390 0
 2387  2388 -2389  409 -2391 0
 2387  2388 -2389  409 -2392 0

c  0-1 --> -1
c    (-b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧ -p_409) -> ( b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0)
c  in CNF:
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨  b^{1, 410}_2
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_1
c     b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨  b^{1, 410}_0
c  in DIMACS:
 2387  2388  2389  409  2390 0
 2387  2388  2389  409 -2391 0
 2387  2388  2389  409  2392 0

c  -1-1 --> -2
c    ( b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧  b^{1, 409}_0 ∧ -p_409) -> ( b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0)
c  in CNF:
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨  b^{1, 410}_2
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨  b^{1, 410}_1
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨  p_409 ∨ -b^{1, 410}_0
c  in DIMACS:
-2387  2388 -2389  409  2390 0
-2387  2388 -2389  409  2391 0
-2387  2388 -2389  409 -2392 0

c  -2-1 --> break 
c    ( b^{1, 409}_2 ∧  b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧ -p_409) -> break
c  in CNF:
c    -b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨  b^{1, 409}_0 ∨  p_409 ∨ break
c  in DIMACS:
-2387 -2388  2389  409 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 409}_2 ∧ -b^{1, 409}_1 ∧ -b^{1, 409}_0 ∧ true) 
c  in CNF:
c    -b^{1, 409}_2 ∨  b^{1, 409}_1 ∨  b^{1, 409}_0 ∨ false 
c  in DIMACS:
-2387  2388  2389  0

c  3 does not represent an automaton state.
c    -(-b^{1, 409}_2 ∧  b^{1, 409}_1 ∧  b^{1, 409}_0 ∧ true) 
c  in CNF:
c     b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ false 
c  in DIMACS:
 2387 -2388 -2389  0
c  -3 does not represent an automaton state.
c    -( b^{1, 409}_2 ∧  b^{1, 409}_1 ∧  b^{1, 409}_0 ∧ true) 
c  in CNF:
c    -b^{1, 409}_2 ∨ -b^{1, 409}_1 ∨ -b^{1, 409}_0 ∨ false 
c  in DIMACS:
-2387 -2388 -2389  0

c i = 410
c  -2+1 --> -1
c    ( b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧  p_410) -> ( b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0)
c  in CNF:
c    -b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨  b^{1, 411}_2
c    -b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_1
c    -b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨  b^{1, 411}_0
c  in DIMACS:
-2390 -2391  2392 -410  2393 0
-2390 -2391  2392 -410 -2394 0
-2390 -2391  2392 -410  2395 0

c  -1+1 --> 0
c    ( b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0 ∧  p_410) -> (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧ -b^{1, 411}_0)
c  in CNF:
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_2
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_1
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_0
c  in DIMACS:
-2390  2391 -2392 -410 -2393 0
-2390  2391 -2392 -410 -2394 0
-2390  2391 -2392 -410 -2395 0

c  0+1 --> 1
c    (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧  p_410) -> (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0)
c  in CNF:
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_2
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_1
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨  b^{1, 411}_0
c  in DIMACS:
 2390  2391  2392 -410 -2393 0
 2390  2391  2392 -410 -2394 0
 2390  2391  2392 -410  2395 0

c  1+1 --> 2
c    (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0 ∧  p_410) -> (-b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0)
c  in CNF:
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_2
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨  b^{1, 411}_1
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ -p_410 ∨ -b^{1, 411}_0
c  in DIMACS:
 2390  2391 -2392 -410 -2393 0
 2390  2391 -2392 -410  2394 0
 2390  2391 -2392 -410 -2395 0

c  2+1 --> break 
c    (-b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧  p_410) -> break
c  in CNF:
c     b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 2390 -2391  2392 -410 1162 0


c  2-1 --> 1
c    (-b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧ -p_410) -> (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0)
c  in CNF:
c     b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_2
c     b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_1
c     b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨  b^{1, 411}_0
c  in DIMACS:
 2390 -2391  2392  410 -2393 0
 2390 -2391  2392  410 -2394 0
 2390 -2391  2392  410  2395 0

c  1-1 --> 0
c    (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0 ∧ -p_410) -> (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧ -b^{1, 411}_0)
c  in CNF:
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_2
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_1
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_0
c  in DIMACS:
 2390  2391 -2392  410 -2393 0
 2390  2391 -2392  410 -2394 0
 2390  2391 -2392  410 -2395 0

c  0-1 --> -1
c    (-b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧ -p_410) -> ( b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0)
c  in CNF:
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨  b^{1, 411}_2
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_1
c     b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨  b^{1, 411}_0
c  in DIMACS:
 2390  2391  2392  410  2393 0
 2390  2391  2392  410 -2394 0
 2390  2391  2392  410  2395 0

c  -1-1 --> -2
c    ( b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧  b^{1, 410}_0 ∧ -p_410) -> ( b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0)
c  in CNF:
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨  b^{1, 411}_2
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨  b^{1, 411}_1
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨  p_410 ∨ -b^{1, 411}_0
c  in DIMACS:
-2390  2391 -2392  410  2393 0
-2390  2391 -2392  410  2394 0
-2390  2391 -2392  410 -2395 0

c  -2-1 --> break 
c    ( b^{1, 410}_2 ∧  b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨  b^{1, 410}_0 ∨  p_410 ∨ break
c  in DIMACS:
-2390 -2391  2392  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 410}_2 ∧ -b^{1, 410}_1 ∧ -b^{1, 410}_0 ∧ true) 
c  in CNF:
c    -b^{1, 410}_2 ∨  b^{1, 410}_1 ∨  b^{1, 410}_0 ∨ false 
c  in DIMACS:
-2390  2391  2392  0

c  3 does not represent an automaton state.
c    -(-b^{1, 410}_2 ∧  b^{1, 410}_1 ∧  b^{1, 410}_0 ∧ true) 
c  in CNF:
c     b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ false 
c  in DIMACS:
 2390 -2391 -2392  0
c  -3 does not represent an automaton state.
c    -( b^{1, 410}_2 ∧  b^{1, 410}_1 ∧  b^{1, 410}_0 ∧ true) 
c  in CNF:
c    -b^{1, 410}_2 ∨ -b^{1, 410}_1 ∨ -b^{1, 410}_0 ∨ false 
c  in DIMACS:
-2390 -2391 -2392  0

c i = 411
c  -2+1 --> -1
c    ( b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧  p_411) -> ( b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0)
c  in CNF:
c    -b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨  b^{1, 412}_2
c    -b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_1
c    -b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨  b^{1, 412}_0
c  in DIMACS:
-2393 -2394  2395 -411  2396 0
-2393 -2394  2395 -411 -2397 0
-2393 -2394  2395 -411  2398 0

c  -1+1 --> 0
c    ( b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0 ∧  p_411) -> (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧ -b^{1, 412}_0)
c  in CNF:
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_2
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_1
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_0
c  in DIMACS:
-2393  2394 -2395 -411 -2396 0
-2393  2394 -2395 -411 -2397 0
-2393  2394 -2395 -411 -2398 0

c  0+1 --> 1
c    (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧  p_411) -> (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0)
c  in CNF:
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_2
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_1
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨  b^{1, 412}_0
c  in DIMACS:
 2393  2394  2395 -411 -2396 0
 2393  2394  2395 -411 -2397 0
 2393  2394  2395 -411  2398 0

c  1+1 --> 2
c    (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0 ∧  p_411) -> (-b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0)
c  in CNF:
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_2
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨  b^{1, 412}_1
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ -p_411 ∨ -b^{1, 412}_0
c  in DIMACS:
 2393  2394 -2395 -411 -2396 0
 2393  2394 -2395 -411  2397 0
 2393  2394 -2395 -411 -2398 0

c  2+1 --> break 
c    (-b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧  p_411) -> break
c  in CNF:
c     b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ -p_411 ∨ break
c  in DIMACS:
 2393 -2394  2395 -411 1162 0


c  2-1 --> 1
c    (-b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧ -p_411) -> (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0)
c  in CNF:
c     b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_2
c     b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_1
c     b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨  b^{1, 412}_0
c  in DIMACS:
 2393 -2394  2395  411 -2396 0
 2393 -2394  2395  411 -2397 0
 2393 -2394  2395  411  2398 0

c  1-1 --> 0
c    (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0 ∧ -p_411) -> (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧ -b^{1, 412}_0)
c  in CNF:
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_2
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_1
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_0
c  in DIMACS:
 2393  2394 -2395  411 -2396 0
 2393  2394 -2395  411 -2397 0
 2393  2394 -2395  411 -2398 0

c  0-1 --> -1
c    (-b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧ -p_411) -> ( b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0)
c  in CNF:
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨  b^{1, 412}_2
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_1
c     b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨  b^{1, 412}_0
c  in DIMACS:
 2393  2394  2395  411  2396 0
 2393  2394  2395  411 -2397 0
 2393  2394  2395  411  2398 0

c  -1-1 --> -2
c    ( b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧  b^{1, 411}_0 ∧ -p_411) -> ( b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0)
c  in CNF:
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨  b^{1, 412}_2
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨  b^{1, 412}_1
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨  p_411 ∨ -b^{1, 412}_0
c  in DIMACS:
-2393  2394 -2395  411  2396 0
-2393  2394 -2395  411  2397 0
-2393  2394 -2395  411 -2398 0

c  -2-1 --> break 
c    ( b^{1, 411}_2 ∧  b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧ -p_411) -> break
c  in CNF:
c    -b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨  b^{1, 411}_0 ∨  p_411 ∨ break
c  in DIMACS:
-2393 -2394  2395  411 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 411}_2 ∧ -b^{1, 411}_1 ∧ -b^{1, 411}_0 ∧ true) 
c  in CNF:
c    -b^{1, 411}_2 ∨  b^{1, 411}_1 ∨  b^{1, 411}_0 ∨ false 
c  in DIMACS:
-2393  2394  2395  0

c  3 does not represent an automaton state.
c    -(-b^{1, 411}_2 ∧  b^{1, 411}_1 ∧  b^{1, 411}_0 ∧ true) 
c  in CNF:
c     b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ false 
c  in DIMACS:
 2393 -2394 -2395  0
c  -3 does not represent an automaton state.
c    -( b^{1, 411}_2 ∧  b^{1, 411}_1 ∧  b^{1, 411}_0 ∧ true) 
c  in CNF:
c    -b^{1, 411}_2 ∨ -b^{1, 411}_1 ∨ -b^{1, 411}_0 ∨ false 
c  in DIMACS:
-2393 -2394 -2395  0

c i = 412
c  -2+1 --> -1
c    ( b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧  p_412) -> ( b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0)
c  in CNF:
c    -b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨  b^{1, 413}_2
c    -b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_1
c    -b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨  b^{1, 413}_0
c  in DIMACS:
-2396 -2397  2398 -412  2399 0
-2396 -2397  2398 -412 -2400 0
-2396 -2397  2398 -412  2401 0

c  -1+1 --> 0
c    ( b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0 ∧  p_412) -> (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧ -b^{1, 413}_0)
c  in CNF:
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_2
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_1
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_0
c  in DIMACS:
-2396  2397 -2398 -412 -2399 0
-2396  2397 -2398 -412 -2400 0
-2396  2397 -2398 -412 -2401 0

c  0+1 --> 1
c    (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧  p_412) -> (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0)
c  in CNF:
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_2
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_1
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨  b^{1, 413}_0
c  in DIMACS:
 2396  2397  2398 -412 -2399 0
 2396  2397  2398 -412 -2400 0
 2396  2397  2398 -412  2401 0

c  1+1 --> 2
c    (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0 ∧  p_412) -> (-b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0)
c  in CNF:
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_2
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨  b^{1, 413}_1
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ -p_412 ∨ -b^{1, 413}_0
c  in DIMACS:
 2396  2397 -2398 -412 -2399 0
 2396  2397 -2398 -412  2400 0
 2396  2397 -2398 -412 -2401 0

c  2+1 --> break 
c    (-b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧  p_412) -> break
c  in CNF:
c     b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ -p_412 ∨ break
c  in DIMACS:
 2396 -2397  2398 -412 1162 0


c  2-1 --> 1
c    (-b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧ -p_412) -> (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0)
c  in CNF:
c     b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_2
c     b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_1
c     b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨  b^{1, 413}_0
c  in DIMACS:
 2396 -2397  2398  412 -2399 0
 2396 -2397  2398  412 -2400 0
 2396 -2397  2398  412  2401 0

c  1-1 --> 0
c    (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0 ∧ -p_412) -> (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧ -b^{1, 413}_0)
c  in CNF:
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_2
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_1
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_0
c  in DIMACS:
 2396  2397 -2398  412 -2399 0
 2396  2397 -2398  412 -2400 0
 2396  2397 -2398  412 -2401 0

c  0-1 --> -1
c    (-b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧ -p_412) -> ( b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0)
c  in CNF:
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨  b^{1, 413}_2
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_1
c     b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨  b^{1, 413}_0
c  in DIMACS:
 2396  2397  2398  412  2399 0
 2396  2397  2398  412 -2400 0
 2396  2397  2398  412  2401 0

c  -1-1 --> -2
c    ( b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧  b^{1, 412}_0 ∧ -p_412) -> ( b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0)
c  in CNF:
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨  b^{1, 413}_2
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨  b^{1, 413}_1
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨  p_412 ∨ -b^{1, 413}_0
c  in DIMACS:
-2396  2397 -2398  412  2399 0
-2396  2397 -2398  412  2400 0
-2396  2397 -2398  412 -2401 0

c  -2-1 --> break 
c    ( b^{1, 412}_2 ∧  b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧ -p_412) -> break
c  in CNF:
c    -b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨  b^{1, 412}_0 ∨  p_412 ∨ break
c  in DIMACS:
-2396 -2397  2398  412 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 412}_2 ∧ -b^{1, 412}_1 ∧ -b^{1, 412}_0 ∧ true) 
c  in CNF:
c    -b^{1, 412}_2 ∨  b^{1, 412}_1 ∨  b^{1, 412}_0 ∨ false 
c  in DIMACS:
-2396  2397  2398  0

c  3 does not represent an automaton state.
c    -(-b^{1, 412}_2 ∧  b^{1, 412}_1 ∧  b^{1, 412}_0 ∧ true) 
c  in CNF:
c     b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ false 
c  in DIMACS:
 2396 -2397 -2398  0
c  -3 does not represent an automaton state.
c    -( b^{1, 412}_2 ∧  b^{1, 412}_1 ∧  b^{1, 412}_0 ∧ true) 
c  in CNF:
c    -b^{1, 412}_2 ∨ -b^{1, 412}_1 ∨ -b^{1, 412}_0 ∨ false 
c  in DIMACS:
-2396 -2397 -2398  0

c i = 413
c  -2+1 --> -1
c    ( b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧  p_413) -> ( b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0)
c  in CNF:
c    -b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨  b^{1, 414}_2
c    -b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_1
c    -b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨  b^{1, 414}_0
c  in DIMACS:
-2399 -2400  2401 -413  2402 0
-2399 -2400  2401 -413 -2403 0
-2399 -2400  2401 -413  2404 0

c  -1+1 --> 0
c    ( b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0 ∧  p_413) -> (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧ -b^{1, 414}_0)
c  in CNF:
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_2
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_1
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_0
c  in DIMACS:
-2399  2400 -2401 -413 -2402 0
-2399  2400 -2401 -413 -2403 0
-2399  2400 -2401 -413 -2404 0

c  0+1 --> 1
c    (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧  p_413) -> (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0)
c  in CNF:
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_2
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_1
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨  b^{1, 414}_0
c  in DIMACS:
 2399  2400  2401 -413 -2402 0
 2399  2400  2401 -413 -2403 0
 2399  2400  2401 -413  2404 0

c  1+1 --> 2
c    (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0 ∧  p_413) -> (-b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0)
c  in CNF:
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_2
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨  b^{1, 414}_1
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ -p_413 ∨ -b^{1, 414}_0
c  in DIMACS:
 2399  2400 -2401 -413 -2402 0
 2399  2400 -2401 -413  2403 0
 2399  2400 -2401 -413 -2404 0

c  2+1 --> break 
c    (-b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧  p_413) -> break
c  in CNF:
c     b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ -p_413 ∨ break
c  in DIMACS:
 2399 -2400  2401 -413 1162 0


c  2-1 --> 1
c    (-b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧ -p_413) -> (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0)
c  in CNF:
c     b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_2
c     b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_1
c     b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨  b^{1, 414}_0
c  in DIMACS:
 2399 -2400  2401  413 -2402 0
 2399 -2400  2401  413 -2403 0
 2399 -2400  2401  413  2404 0

c  1-1 --> 0
c    (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0 ∧ -p_413) -> (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧ -b^{1, 414}_0)
c  in CNF:
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_2
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_1
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_0
c  in DIMACS:
 2399  2400 -2401  413 -2402 0
 2399  2400 -2401  413 -2403 0
 2399  2400 -2401  413 -2404 0

c  0-1 --> -1
c    (-b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧ -p_413) -> ( b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0)
c  in CNF:
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨  b^{1, 414}_2
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_1
c     b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨  b^{1, 414}_0
c  in DIMACS:
 2399  2400  2401  413  2402 0
 2399  2400  2401  413 -2403 0
 2399  2400  2401  413  2404 0

c  -1-1 --> -2
c    ( b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧  b^{1, 413}_0 ∧ -p_413) -> ( b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0)
c  in CNF:
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨  b^{1, 414}_2
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨  b^{1, 414}_1
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨  p_413 ∨ -b^{1, 414}_0
c  in DIMACS:
-2399  2400 -2401  413  2402 0
-2399  2400 -2401  413  2403 0
-2399  2400 -2401  413 -2404 0

c  -2-1 --> break 
c    ( b^{1, 413}_2 ∧  b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧ -p_413) -> break
c  in CNF:
c    -b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨  b^{1, 413}_0 ∨  p_413 ∨ break
c  in DIMACS:
-2399 -2400  2401  413 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 413}_2 ∧ -b^{1, 413}_1 ∧ -b^{1, 413}_0 ∧ true) 
c  in CNF:
c    -b^{1, 413}_2 ∨  b^{1, 413}_1 ∨  b^{1, 413}_0 ∨ false 
c  in DIMACS:
-2399  2400  2401  0

c  3 does not represent an automaton state.
c    -(-b^{1, 413}_2 ∧  b^{1, 413}_1 ∧  b^{1, 413}_0 ∧ true) 
c  in CNF:
c     b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ false 
c  in DIMACS:
 2399 -2400 -2401  0
c  -3 does not represent an automaton state.
c    -( b^{1, 413}_2 ∧  b^{1, 413}_1 ∧  b^{1, 413}_0 ∧ true) 
c  in CNF:
c    -b^{1, 413}_2 ∨ -b^{1, 413}_1 ∨ -b^{1, 413}_0 ∨ false 
c  in DIMACS:
-2399 -2400 -2401  0

c i = 414
c  -2+1 --> -1
c    ( b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧  p_414) -> ( b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0)
c  in CNF:
c    -b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨  b^{1, 415}_2
c    -b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_1
c    -b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨  b^{1, 415}_0
c  in DIMACS:
-2402 -2403  2404 -414  2405 0
-2402 -2403  2404 -414 -2406 0
-2402 -2403  2404 -414  2407 0

c  -1+1 --> 0
c    ( b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0 ∧  p_414) -> (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧ -b^{1, 415}_0)
c  in CNF:
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_2
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_1
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_0
c  in DIMACS:
-2402  2403 -2404 -414 -2405 0
-2402  2403 -2404 -414 -2406 0
-2402  2403 -2404 -414 -2407 0

c  0+1 --> 1
c    (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧  p_414) -> (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0)
c  in CNF:
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_2
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_1
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨  b^{1, 415}_0
c  in DIMACS:
 2402  2403  2404 -414 -2405 0
 2402  2403  2404 -414 -2406 0
 2402  2403  2404 -414  2407 0

c  1+1 --> 2
c    (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0 ∧  p_414) -> (-b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0)
c  in CNF:
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_2
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨  b^{1, 415}_1
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ -p_414 ∨ -b^{1, 415}_0
c  in DIMACS:
 2402  2403 -2404 -414 -2405 0
 2402  2403 -2404 -414  2406 0
 2402  2403 -2404 -414 -2407 0

c  2+1 --> break 
c    (-b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧  p_414) -> break
c  in CNF:
c     b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 2402 -2403  2404 -414 1162 0


c  2-1 --> 1
c    (-b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧ -p_414) -> (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0)
c  in CNF:
c     b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_2
c     b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_1
c     b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨  b^{1, 415}_0
c  in DIMACS:
 2402 -2403  2404  414 -2405 0
 2402 -2403  2404  414 -2406 0
 2402 -2403  2404  414  2407 0

c  1-1 --> 0
c    (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0 ∧ -p_414) -> (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧ -b^{1, 415}_0)
c  in CNF:
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_2
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_1
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_0
c  in DIMACS:
 2402  2403 -2404  414 -2405 0
 2402  2403 -2404  414 -2406 0
 2402  2403 -2404  414 -2407 0

c  0-1 --> -1
c    (-b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧ -p_414) -> ( b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0)
c  in CNF:
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨  b^{1, 415}_2
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_1
c     b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨  b^{1, 415}_0
c  in DIMACS:
 2402  2403  2404  414  2405 0
 2402  2403  2404  414 -2406 0
 2402  2403  2404  414  2407 0

c  -1-1 --> -2
c    ( b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧  b^{1, 414}_0 ∧ -p_414) -> ( b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0)
c  in CNF:
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨  b^{1, 415}_2
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨  b^{1, 415}_1
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨  p_414 ∨ -b^{1, 415}_0
c  in DIMACS:
-2402  2403 -2404  414  2405 0
-2402  2403 -2404  414  2406 0
-2402  2403 -2404  414 -2407 0

c  -2-1 --> break 
c    ( b^{1, 414}_2 ∧  b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨  b^{1, 414}_0 ∨  p_414 ∨ break
c  in DIMACS:
-2402 -2403  2404  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 414}_2 ∧ -b^{1, 414}_1 ∧ -b^{1, 414}_0 ∧ true) 
c  in CNF:
c    -b^{1, 414}_2 ∨  b^{1, 414}_1 ∨  b^{1, 414}_0 ∨ false 
c  in DIMACS:
-2402  2403  2404  0

c  3 does not represent an automaton state.
c    -(-b^{1, 414}_2 ∧  b^{1, 414}_1 ∧  b^{1, 414}_0 ∧ true) 
c  in CNF:
c     b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ false 
c  in DIMACS:
 2402 -2403 -2404  0
c  -3 does not represent an automaton state.
c    -( b^{1, 414}_2 ∧  b^{1, 414}_1 ∧  b^{1, 414}_0 ∧ true) 
c  in CNF:
c    -b^{1, 414}_2 ∨ -b^{1, 414}_1 ∨ -b^{1, 414}_0 ∨ false 
c  in DIMACS:
-2402 -2403 -2404  0

c i = 415
c  -2+1 --> -1
c    ( b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧  p_415) -> ( b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0)
c  in CNF:
c    -b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨  b^{1, 416}_2
c    -b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_1
c    -b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨  b^{1, 416}_0
c  in DIMACS:
-2405 -2406  2407 -415  2408 0
-2405 -2406  2407 -415 -2409 0
-2405 -2406  2407 -415  2410 0

c  -1+1 --> 0
c    ( b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0 ∧  p_415) -> (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧ -b^{1, 416}_0)
c  in CNF:
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_2
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_1
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_0
c  in DIMACS:
-2405  2406 -2407 -415 -2408 0
-2405  2406 -2407 -415 -2409 0
-2405  2406 -2407 -415 -2410 0

c  0+1 --> 1
c    (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧  p_415) -> (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0)
c  in CNF:
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_2
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_1
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨  b^{1, 416}_0
c  in DIMACS:
 2405  2406  2407 -415 -2408 0
 2405  2406  2407 -415 -2409 0
 2405  2406  2407 -415  2410 0

c  1+1 --> 2
c    (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0 ∧  p_415) -> (-b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0)
c  in CNF:
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_2
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨  b^{1, 416}_1
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ -p_415 ∨ -b^{1, 416}_0
c  in DIMACS:
 2405  2406 -2407 -415 -2408 0
 2405  2406 -2407 -415  2409 0
 2405  2406 -2407 -415 -2410 0

c  2+1 --> break 
c    (-b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧  p_415) -> break
c  in CNF:
c     b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ -p_415 ∨ break
c  in DIMACS:
 2405 -2406  2407 -415 1162 0


c  2-1 --> 1
c    (-b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧ -p_415) -> (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0)
c  in CNF:
c     b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_2
c     b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_1
c     b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨  b^{1, 416}_0
c  in DIMACS:
 2405 -2406  2407  415 -2408 0
 2405 -2406  2407  415 -2409 0
 2405 -2406  2407  415  2410 0

c  1-1 --> 0
c    (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0 ∧ -p_415) -> (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧ -b^{1, 416}_0)
c  in CNF:
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_2
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_1
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_0
c  in DIMACS:
 2405  2406 -2407  415 -2408 0
 2405  2406 -2407  415 -2409 0
 2405  2406 -2407  415 -2410 0

c  0-1 --> -1
c    (-b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧ -p_415) -> ( b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0)
c  in CNF:
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨  b^{1, 416}_2
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_1
c     b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨  b^{1, 416}_0
c  in DIMACS:
 2405  2406  2407  415  2408 0
 2405  2406  2407  415 -2409 0
 2405  2406  2407  415  2410 0

c  -1-1 --> -2
c    ( b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧  b^{1, 415}_0 ∧ -p_415) -> ( b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0)
c  in CNF:
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨  b^{1, 416}_2
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨  b^{1, 416}_1
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨  p_415 ∨ -b^{1, 416}_0
c  in DIMACS:
-2405  2406 -2407  415  2408 0
-2405  2406 -2407  415  2409 0
-2405  2406 -2407  415 -2410 0

c  -2-1 --> break 
c    ( b^{1, 415}_2 ∧  b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧ -p_415) -> break
c  in CNF:
c    -b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨  b^{1, 415}_0 ∨  p_415 ∨ break
c  in DIMACS:
-2405 -2406  2407  415 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 415}_2 ∧ -b^{1, 415}_1 ∧ -b^{1, 415}_0 ∧ true) 
c  in CNF:
c    -b^{1, 415}_2 ∨  b^{1, 415}_1 ∨  b^{1, 415}_0 ∨ false 
c  in DIMACS:
-2405  2406  2407  0

c  3 does not represent an automaton state.
c    -(-b^{1, 415}_2 ∧  b^{1, 415}_1 ∧  b^{1, 415}_0 ∧ true) 
c  in CNF:
c     b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ false 
c  in DIMACS:
 2405 -2406 -2407  0
c  -3 does not represent an automaton state.
c    -( b^{1, 415}_2 ∧  b^{1, 415}_1 ∧  b^{1, 415}_0 ∧ true) 
c  in CNF:
c    -b^{1, 415}_2 ∨ -b^{1, 415}_1 ∨ -b^{1, 415}_0 ∨ false 
c  in DIMACS:
-2405 -2406 -2407  0

c i = 416
c  -2+1 --> -1
c    ( b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧  p_416) -> ( b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0)
c  in CNF:
c    -b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨  b^{1, 417}_2
c    -b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_1
c    -b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨  b^{1, 417}_0
c  in DIMACS:
-2408 -2409  2410 -416  2411 0
-2408 -2409  2410 -416 -2412 0
-2408 -2409  2410 -416  2413 0

c  -1+1 --> 0
c    ( b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0 ∧  p_416) -> (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧ -b^{1, 417}_0)
c  in CNF:
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_2
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_1
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_0
c  in DIMACS:
-2408  2409 -2410 -416 -2411 0
-2408  2409 -2410 -416 -2412 0
-2408  2409 -2410 -416 -2413 0

c  0+1 --> 1
c    (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧  p_416) -> (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0)
c  in CNF:
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_2
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_1
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨  b^{1, 417}_0
c  in DIMACS:
 2408  2409  2410 -416 -2411 0
 2408  2409  2410 -416 -2412 0
 2408  2409  2410 -416  2413 0

c  1+1 --> 2
c    (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0 ∧  p_416) -> (-b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0)
c  in CNF:
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_2
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨  b^{1, 417}_1
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ -p_416 ∨ -b^{1, 417}_0
c  in DIMACS:
 2408  2409 -2410 -416 -2411 0
 2408  2409 -2410 -416  2412 0
 2408  2409 -2410 -416 -2413 0

c  2+1 --> break 
c    (-b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧  p_416) -> break
c  in CNF:
c     b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 2408 -2409  2410 -416 1162 0


c  2-1 --> 1
c    (-b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧ -p_416) -> (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0)
c  in CNF:
c     b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_2
c     b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_1
c     b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨  b^{1, 417}_0
c  in DIMACS:
 2408 -2409  2410  416 -2411 0
 2408 -2409  2410  416 -2412 0
 2408 -2409  2410  416  2413 0

c  1-1 --> 0
c    (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0 ∧ -p_416) -> (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧ -b^{1, 417}_0)
c  in CNF:
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_2
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_1
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_0
c  in DIMACS:
 2408  2409 -2410  416 -2411 0
 2408  2409 -2410  416 -2412 0
 2408  2409 -2410  416 -2413 0

c  0-1 --> -1
c    (-b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧ -p_416) -> ( b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0)
c  in CNF:
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨  b^{1, 417}_2
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_1
c     b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨  b^{1, 417}_0
c  in DIMACS:
 2408  2409  2410  416  2411 0
 2408  2409  2410  416 -2412 0
 2408  2409  2410  416  2413 0

c  -1-1 --> -2
c    ( b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧  b^{1, 416}_0 ∧ -p_416) -> ( b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0)
c  in CNF:
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨  b^{1, 417}_2
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨  b^{1, 417}_1
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨  p_416 ∨ -b^{1, 417}_0
c  in DIMACS:
-2408  2409 -2410  416  2411 0
-2408  2409 -2410  416  2412 0
-2408  2409 -2410  416 -2413 0

c  -2-1 --> break 
c    ( b^{1, 416}_2 ∧  b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨  b^{1, 416}_0 ∨  p_416 ∨ break
c  in DIMACS:
-2408 -2409  2410  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 416}_2 ∧ -b^{1, 416}_1 ∧ -b^{1, 416}_0 ∧ true) 
c  in CNF:
c    -b^{1, 416}_2 ∨  b^{1, 416}_1 ∨  b^{1, 416}_0 ∨ false 
c  in DIMACS:
-2408  2409  2410  0

c  3 does not represent an automaton state.
c    -(-b^{1, 416}_2 ∧  b^{1, 416}_1 ∧  b^{1, 416}_0 ∧ true) 
c  in CNF:
c     b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ false 
c  in DIMACS:
 2408 -2409 -2410  0
c  -3 does not represent an automaton state.
c    -( b^{1, 416}_2 ∧  b^{1, 416}_1 ∧  b^{1, 416}_0 ∧ true) 
c  in CNF:
c    -b^{1, 416}_2 ∨ -b^{1, 416}_1 ∨ -b^{1, 416}_0 ∨ false 
c  in DIMACS:
-2408 -2409 -2410  0

c i = 417
c  -2+1 --> -1
c    ( b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧  p_417) -> ( b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0)
c  in CNF:
c    -b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨  b^{1, 418}_2
c    -b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_1
c    -b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨  b^{1, 418}_0
c  in DIMACS:
-2411 -2412  2413 -417  2414 0
-2411 -2412  2413 -417 -2415 0
-2411 -2412  2413 -417  2416 0

c  -1+1 --> 0
c    ( b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0 ∧  p_417) -> (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧ -b^{1, 418}_0)
c  in CNF:
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_2
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_1
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_0
c  in DIMACS:
-2411  2412 -2413 -417 -2414 0
-2411  2412 -2413 -417 -2415 0
-2411  2412 -2413 -417 -2416 0

c  0+1 --> 1
c    (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧  p_417) -> (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0)
c  in CNF:
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_2
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_1
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨  b^{1, 418}_0
c  in DIMACS:
 2411  2412  2413 -417 -2414 0
 2411  2412  2413 -417 -2415 0
 2411  2412  2413 -417  2416 0

c  1+1 --> 2
c    (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0 ∧  p_417) -> (-b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0)
c  in CNF:
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_2
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨  b^{1, 418}_1
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ -p_417 ∨ -b^{1, 418}_0
c  in DIMACS:
 2411  2412 -2413 -417 -2414 0
 2411  2412 -2413 -417  2415 0
 2411  2412 -2413 -417 -2416 0

c  2+1 --> break 
c    (-b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧  p_417) -> break
c  in CNF:
c     b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ -p_417 ∨ break
c  in DIMACS:
 2411 -2412  2413 -417 1162 0


c  2-1 --> 1
c    (-b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧ -p_417) -> (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0)
c  in CNF:
c     b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_2
c     b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_1
c     b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨  b^{1, 418}_0
c  in DIMACS:
 2411 -2412  2413  417 -2414 0
 2411 -2412  2413  417 -2415 0
 2411 -2412  2413  417  2416 0

c  1-1 --> 0
c    (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0 ∧ -p_417) -> (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧ -b^{1, 418}_0)
c  in CNF:
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_2
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_1
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_0
c  in DIMACS:
 2411  2412 -2413  417 -2414 0
 2411  2412 -2413  417 -2415 0
 2411  2412 -2413  417 -2416 0

c  0-1 --> -1
c    (-b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧ -p_417) -> ( b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0)
c  in CNF:
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨  b^{1, 418}_2
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_1
c     b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨  b^{1, 418}_0
c  in DIMACS:
 2411  2412  2413  417  2414 0
 2411  2412  2413  417 -2415 0
 2411  2412  2413  417  2416 0

c  -1-1 --> -2
c    ( b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧  b^{1, 417}_0 ∧ -p_417) -> ( b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0)
c  in CNF:
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨  b^{1, 418}_2
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨  b^{1, 418}_1
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨  p_417 ∨ -b^{1, 418}_0
c  in DIMACS:
-2411  2412 -2413  417  2414 0
-2411  2412 -2413  417  2415 0
-2411  2412 -2413  417 -2416 0

c  -2-1 --> break 
c    ( b^{1, 417}_2 ∧  b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧ -p_417) -> break
c  in CNF:
c    -b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨  b^{1, 417}_0 ∨  p_417 ∨ break
c  in DIMACS:
-2411 -2412  2413  417 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 417}_2 ∧ -b^{1, 417}_1 ∧ -b^{1, 417}_0 ∧ true) 
c  in CNF:
c    -b^{1, 417}_2 ∨  b^{1, 417}_1 ∨  b^{1, 417}_0 ∨ false 
c  in DIMACS:
-2411  2412  2413  0

c  3 does not represent an automaton state.
c    -(-b^{1, 417}_2 ∧  b^{1, 417}_1 ∧  b^{1, 417}_0 ∧ true) 
c  in CNF:
c     b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ false 
c  in DIMACS:
 2411 -2412 -2413  0
c  -3 does not represent an automaton state.
c    -( b^{1, 417}_2 ∧  b^{1, 417}_1 ∧  b^{1, 417}_0 ∧ true) 
c  in CNF:
c    -b^{1, 417}_2 ∨ -b^{1, 417}_1 ∨ -b^{1, 417}_0 ∨ false 
c  in DIMACS:
-2411 -2412 -2413  0

c i = 418
c  -2+1 --> -1
c    ( b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧  p_418) -> ( b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0)
c  in CNF:
c    -b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨  b^{1, 419}_2
c    -b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_1
c    -b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨  b^{1, 419}_0
c  in DIMACS:
-2414 -2415  2416 -418  2417 0
-2414 -2415  2416 -418 -2418 0
-2414 -2415  2416 -418  2419 0

c  -1+1 --> 0
c    ( b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0 ∧  p_418) -> (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧ -b^{1, 419}_0)
c  in CNF:
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_2
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_1
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_0
c  in DIMACS:
-2414  2415 -2416 -418 -2417 0
-2414  2415 -2416 -418 -2418 0
-2414  2415 -2416 -418 -2419 0

c  0+1 --> 1
c    (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧  p_418) -> (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0)
c  in CNF:
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_2
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_1
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨  b^{1, 419}_0
c  in DIMACS:
 2414  2415  2416 -418 -2417 0
 2414  2415  2416 -418 -2418 0
 2414  2415  2416 -418  2419 0

c  1+1 --> 2
c    (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0 ∧  p_418) -> (-b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0)
c  in CNF:
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_2
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨  b^{1, 419}_1
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ -p_418 ∨ -b^{1, 419}_0
c  in DIMACS:
 2414  2415 -2416 -418 -2417 0
 2414  2415 -2416 -418  2418 0
 2414  2415 -2416 -418 -2419 0

c  2+1 --> break 
c    (-b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧  p_418) -> break
c  in CNF:
c     b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 2414 -2415  2416 -418 1162 0


c  2-1 --> 1
c    (-b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧ -p_418) -> (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0)
c  in CNF:
c     b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_2
c     b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_1
c     b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨  b^{1, 419}_0
c  in DIMACS:
 2414 -2415  2416  418 -2417 0
 2414 -2415  2416  418 -2418 0
 2414 -2415  2416  418  2419 0

c  1-1 --> 0
c    (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0 ∧ -p_418) -> (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧ -b^{1, 419}_0)
c  in CNF:
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_2
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_1
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_0
c  in DIMACS:
 2414  2415 -2416  418 -2417 0
 2414  2415 -2416  418 -2418 0
 2414  2415 -2416  418 -2419 0

c  0-1 --> -1
c    (-b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧ -p_418) -> ( b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0)
c  in CNF:
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨  b^{1, 419}_2
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_1
c     b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨  b^{1, 419}_0
c  in DIMACS:
 2414  2415  2416  418  2417 0
 2414  2415  2416  418 -2418 0
 2414  2415  2416  418  2419 0

c  -1-1 --> -2
c    ( b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧  b^{1, 418}_0 ∧ -p_418) -> ( b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0)
c  in CNF:
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨  b^{1, 419}_2
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨  b^{1, 419}_1
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨  p_418 ∨ -b^{1, 419}_0
c  in DIMACS:
-2414  2415 -2416  418  2417 0
-2414  2415 -2416  418  2418 0
-2414  2415 -2416  418 -2419 0

c  -2-1 --> break 
c    ( b^{1, 418}_2 ∧  b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨  b^{1, 418}_0 ∨  p_418 ∨ break
c  in DIMACS:
-2414 -2415  2416  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 418}_2 ∧ -b^{1, 418}_1 ∧ -b^{1, 418}_0 ∧ true) 
c  in CNF:
c    -b^{1, 418}_2 ∨  b^{1, 418}_1 ∨  b^{1, 418}_0 ∨ false 
c  in DIMACS:
-2414  2415  2416  0

c  3 does not represent an automaton state.
c    -(-b^{1, 418}_2 ∧  b^{1, 418}_1 ∧  b^{1, 418}_0 ∧ true) 
c  in CNF:
c     b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ false 
c  in DIMACS:
 2414 -2415 -2416  0
c  -3 does not represent an automaton state.
c    -( b^{1, 418}_2 ∧  b^{1, 418}_1 ∧  b^{1, 418}_0 ∧ true) 
c  in CNF:
c    -b^{1, 418}_2 ∨ -b^{1, 418}_1 ∨ -b^{1, 418}_0 ∨ false 
c  in DIMACS:
-2414 -2415 -2416  0

c i = 419
c  -2+1 --> -1
c    ( b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧  p_419) -> ( b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0)
c  in CNF:
c    -b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨  b^{1, 420}_2
c    -b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_1
c    -b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨  b^{1, 420}_0
c  in DIMACS:
-2417 -2418  2419 -419  2420 0
-2417 -2418  2419 -419 -2421 0
-2417 -2418  2419 -419  2422 0

c  -1+1 --> 0
c    ( b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0 ∧  p_419) -> (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧ -b^{1, 420}_0)
c  in CNF:
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_2
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_1
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_0
c  in DIMACS:
-2417  2418 -2419 -419 -2420 0
-2417  2418 -2419 -419 -2421 0
-2417  2418 -2419 -419 -2422 0

c  0+1 --> 1
c    (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧  p_419) -> (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0)
c  in CNF:
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_2
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_1
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨  b^{1, 420}_0
c  in DIMACS:
 2417  2418  2419 -419 -2420 0
 2417  2418  2419 -419 -2421 0
 2417  2418  2419 -419  2422 0

c  1+1 --> 2
c    (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0 ∧  p_419) -> (-b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0)
c  in CNF:
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_2
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨  b^{1, 420}_1
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ -p_419 ∨ -b^{1, 420}_0
c  in DIMACS:
 2417  2418 -2419 -419 -2420 0
 2417  2418 -2419 -419  2421 0
 2417  2418 -2419 -419 -2422 0

c  2+1 --> break 
c    (-b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧  p_419) -> break
c  in CNF:
c     b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ -p_419 ∨ break
c  in DIMACS:
 2417 -2418  2419 -419 1162 0


c  2-1 --> 1
c    (-b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧ -p_419) -> (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0)
c  in CNF:
c     b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_2
c     b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_1
c     b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨  b^{1, 420}_0
c  in DIMACS:
 2417 -2418  2419  419 -2420 0
 2417 -2418  2419  419 -2421 0
 2417 -2418  2419  419  2422 0

c  1-1 --> 0
c    (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0 ∧ -p_419) -> (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧ -b^{1, 420}_0)
c  in CNF:
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_2
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_1
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_0
c  in DIMACS:
 2417  2418 -2419  419 -2420 0
 2417  2418 -2419  419 -2421 0
 2417  2418 -2419  419 -2422 0

c  0-1 --> -1
c    (-b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧ -p_419) -> ( b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0)
c  in CNF:
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨  b^{1, 420}_2
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_1
c     b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨  b^{1, 420}_0
c  in DIMACS:
 2417  2418  2419  419  2420 0
 2417  2418  2419  419 -2421 0
 2417  2418  2419  419  2422 0

c  -1-1 --> -2
c    ( b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧  b^{1, 419}_0 ∧ -p_419) -> ( b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0)
c  in CNF:
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨  b^{1, 420}_2
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨  b^{1, 420}_1
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨  p_419 ∨ -b^{1, 420}_0
c  in DIMACS:
-2417  2418 -2419  419  2420 0
-2417  2418 -2419  419  2421 0
-2417  2418 -2419  419 -2422 0

c  -2-1 --> break 
c    ( b^{1, 419}_2 ∧  b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧ -p_419) -> break
c  in CNF:
c    -b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨  b^{1, 419}_0 ∨  p_419 ∨ break
c  in DIMACS:
-2417 -2418  2419  419 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 419}_2 ∧ -b^{1, 419}_1 ∧ -b^{1, 419}_0 ∧ true) 
c  in CNF:
c    -b^{1, 419}_2 ∨  b^{1, 419}_1 ∨  b^{1, 419}_0 ∨ false 
c  in DIMACS:
-2417  2418  2419  0

c  3 does not represent an automaton state.
c    -(-b^{1, 419}_2 ∧  b^{1, 419}_1 ∧  b^{1, 419}_0 ∧ true) 
c  in CNF:
c     b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ false 
c  in DIMACS:
 2417 -2418 -2419  0
c  -3 does not represent an automaton state.
c    -( b^{1, 419}_2 ∧  b^{1, 419}_1 ∧  b^{1, 419}_0 ∧ true) 
c  in CNF:
c    -b^{1, 419}_2 ∨ -b^{1, 419}_1 ∨ -b^{1, 419}_0 ∨ false 
c  in DIMACS:
-2417 -2418 -2419  0

c i = 420
c  -2+1 --> -1
c    ( b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧  p_420) -> ( b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0)
c  in CNF:
c    -b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨  b^{1, 421}_2
c    -b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_1
c    -b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨  b^{1, 421}_0
c  in DIMACS:
-2420 -2421  2422 -420  2423 0
-2420 -2421  2422 -420 -2424 0
-2420 -2421  2422 -420  2425 0

c  -1+1 --> 0
c    ( b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0 ∧  p_420) -> (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧ -b^{1, 421}_0)
c  in CNF:
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_2
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_1
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_0
c  in DIMACS:
-2420  2421 -2422 -420 -2423 0
-2420  2421 -2422 -420 -2424 0
-2420  2421 -2422 -420 -2425 0

c  0+1 --> 1
c    (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧  p_420) -> (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0)
c  in CNF:
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_2
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_1
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨  b^{1, 421}_0
c  in DIMACS:
 2420  2421  2422 -420 -2423 0
 2420  2421  2422 -420 -2424 0
 2420  2421  2422 -420  2425 0

c  1+1 --> 2
c    (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0 ∧  p_420) -> (-b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0)
c  in CNF:
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_2
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨  b^{1, 421}_1
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ -p_420 ∨ -b^{1, 421}_0
c  in DIMACS:
 2420  2421 -2422 -420 -2423 0
 2420  2421 -2422 -420  2424 0
 2420  2421 -2422 -420 -2425 0

c  2+1 --> break 
c    (-b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧  p_420) -> break
c  in CNF:
c     b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 2420 -2421  2422 -420 1162 0


c  2-1 --> 1
c    (-b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧ -p_420) -> (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0)
c  in CNF:
c     b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_2
c     b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_1
c     b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨  b^{1, 421}_0
c  in DIMACS:
 2420 -2421  2422  420 -2423 0
 2420 -2421  2422  420 -2424 0
 2420 -2421  2422  420  2425 0

c  1-1 --> 0
c    (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0 ∧ -p_420) -> (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧ -b^{1, 421}_0)
c  in CNF:
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_2
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_1
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_0
c  in DIMACS:
 2420  2421 -2422  420 -2423 0
 2420  2421 -2422  420 -2424 0
 2420  2421 -2422  420 -2425 0

c  0-1 --> -1
c    (-b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧ -p_420) -> ( b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0)
c  in CNF:
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨  b^{1, 421}_2
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_1
c     b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨  b^{1, 421}_0
c  in DIMACS:
 2420  2421  2422  420  2423 0
 2420  2421  2422  420 -2424 0
 2420  2421  2422  420  2425 0

c  -1-1 --> -2
c    ( b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧  b^{1, 420}_0 ∧ -p_420) -> ( b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0)
c  in CNF:
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨  b^{1, 421}_2
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨  b^{1, 421}_1
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨  p_420 ∨ -b^{1, 421}_0
c  in DIMACS:
-2420  2421 -2422  420  2423 0
-2420  2421 -2422  420  2424 0
-2420  2421 -2422  420 -2425 0

c  -2-1 --> break 
c    ( b^{1, 420}_2 ∧  b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨  b^{1, 420}_0 ∨  p_420 ∨ break
c  in DIMACS:
-2420 -2421  2422  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 420}_2 ∧ -b^{1, 420}_1 ∧ -b^{1, 420}_0 ∧ true) 
c  in CNF:
c    -b^{1, 420}_2 ∨  b^{1, 420}_1 ∨  b^{1, 420}_0 ∨ false 
c  in DIMACS:
-2420  2421  2422  0

c  3 does not represent an automaton state.
c    -(-b^{1, 420}_2 ∧  b^{1, 420}_1 ∧  b^{1, 420}_0 ∧ true) 
c  in CNF:
c     b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ false 
c  in DIMACS:
 2420 -2421 -2422  0
c  -3 does not represent an automaton state.
c    -( b^{1, 420}_2 ∧  b^{1, 420}_1 ∧  b^{1, 420}_0 ∧ true) 
c  in CNF:
c    -b^{1, 420}_2 ∨ -b^{1, 420}_1 ∨ -b^{1, 420}_0 ∨ false 
c  in DIMACS:
-2420 -2421 -2422  0

c i = 421
c  -2+1 --> -1
c    ( b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧  p_421) -> ( b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0)
c  in CNF:
c    -b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨  b^{1, 422}_2
c    -b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_1
c    -b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨  b^{1, 422}_0
c  in DIMACS:
-2423 -2424  2425 -421  2426 0
-2423 -2424  2425 -421 -2427 0
-2423 -2424  2425 -421  2428 0

c  -1+1 --> 0
c    ( b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0 ∧  p_421) -> (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧ -b^{1, 422}_0)
c  in CNF:
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_2
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_1
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_0
c  in DIMACS:
-2423  2424 -2425 -421 -2426 0
-2423  2424 -2425 -421 -2427 0
-2423  2424 -2425 -421 -2428 0

c  0+1 --> 1
c    (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧  p_421) -> (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0)
c  in CNF:
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_2
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_1
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨  b^{1, 422}_0
c  in DIMACS:
 2423  2424  2425 -421 -2426 0
 2423  2424  2425 -421 -2427 0
 2423  2424  2425 -421  2428 0

c  1+1 --> 2
c    (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0 ∧  p_421) -> (-b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0)
c  in CNF:
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_2
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨  b^{1, 422}_1
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ -p_421 ∨ -b^{1, 422}_0
c  in DIMACS:
 2423  2424 -2425 -421 -2426 0
 2423  2424 -2425 -421  2427 0
 2423  2424 -2425 -421 -2428 0

c  2+1 --> break 
c    (-b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧  p_421) -> break
c  in CNF:
c     b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ -p_421 ∨ break
c  in DIMACS:
 2423 -2424  2425 -421 1162 0


c  2-1 --> 1
c    (-b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧ -p_421) -> (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0)
c  in CNF:
c     b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_2
c     b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_1
c     b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨  b^{1, 422}_0
c  in DIMACS:
 2423 -2424  2425  421 -2426 0
 2423 -2424  2425  421 -2427 0
 2423 -2424  2425  421  2428 0

c  1-1 --> 0
c    (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0 ∧ -p_421) -> (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧ -b^{1, 422}_0)
c  in CNF:
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_2
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_1
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_0
c  in DIMACS:
 2423  2424 -2425  421 -2426 0
 2423  2424 -2425  421 -2427 0
 2423  2424 -2425  421 -2428 0

c  0-1 --> -1
c    (-b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧ -p_421) -> ( b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0)
c  in CNF:
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨  b^{1, 422}_2
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_1
c     b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨  b^{1, 422}_0
c  in DIMACS:
 2423  2424  2425  421  2426 0
 2423  2424  2425  421 -2427 0
 2423  2424  2425  421  2428 0

c  -1-1 --> -2
c    ( b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧  b^{1, 421}_0 ∧ -p_421) -> ( b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0)
c  in CNF:
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨  b^{1, 422}_2
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨  b^{1, 422}_1
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨  p_421 ∨ -b^{1, 422}_0
c  in DIMACS:
-2423  2424 -2425  421  2426 0
-2423  2424 -2425  421  2427 0
-2423  2424 -2425  421 -2428 0

c  -2-1 --> break 
c    ( b^{1, 421}_2 ∧  b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧ -p_421) -> break
c  in CNF:
c    -b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨  b^{1, 421}_0 ∨  p_421 ∨ break
c  in DIMACS:
-2423 -2424  2425  421 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 421}_2 ∧ -b^{1, 421}_1 ∧ -b^{1, 421}_0 ∧ true) 
c  in CNF:
c    -b^{1, 421}_2 ∨  b^{1, 421}_1 ∨  b^{1, 421}_0 ∨ false 
c  in DIMACS:
-2423  2424  2425  0

c  3 does not represent an automaton state.
c    -(-b^{1, 421}_2 ∧  b^{1, 421}_1 ∧  b^{1, 421}_0 ∧ true) 
c  in CNF:
c     b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ false 
c  in DIMACS:
 2423 -2424 -2425  0
c  -3 does not represent an automaton state.
c    -( b^{1, 421}_2 ∧  b^{1, 421}_1 ∧  b^{1, 421}_0 ∧ true) 
c  in CNF:
c    -b^{1, 421}_2 ∨ -b^{1, 421}_1 ∨ -b^{1, 421}_0 ∨ false 
c  in DIMACS:
-2423 -2424 -2425  0

c i = 422
c  -2+1 --> -1
c    ( b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧  p_422) -> ( b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0)
c  in CNF:
c    -b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨  b^{1, 423}_2
c    -b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_1
c    -b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨  b^{1, 423}_0
c  in DIMACS:
-2426 -2427  2428 -422  2429 0
-2426 -2427  2428 -422 -2430 0
-2426 -2427  2428 -422  2431 0

c  -1+1 --> 0
c    ( b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0 ∧  p_422) -> (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧ -b^{1, 423}_0)
c  in CNF:
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_2
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_1
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_0
c  in DIMACS:
-2426  2427 -2428 -422 -2429 0
-2426  2427 -2428 -422 -2430 0
-2426  2427 -2428 -422 -2431 0

c  0+1 --> 1
c    (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧  p_422) -> (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0)
c  in CNF:
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_2
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_1
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨  b^{1, 423}_0
c  in DIMACS:
 2426  2427  2428 -422 -2429 0
 2426  2427  2428 -422 -2430 0
 2426  2427  2428 -422  2431 0

c  1+1 --> 2
c    (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0 ∧  p_422) -> (-b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0)
c  in CNF:
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_2
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨  b^{1, 423}_1
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ -p_422 ∨ -b^{1, 423}_0
c  in DIMACS:
 2426  2427 -2428 -422 -2429 0
 2426  2427 -2428 -422  2430 0
 2426  2427 -2428 -422 -2431 0

c  2+1 --> break 
c    (-b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧  p_422) -> break
c  in CNF:
c     b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ -p_422 ∨ break
c  in DIMACS:
 2426 -2427  2428 -422 1162 0


c  2-1 --> 1
c    (-b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧ -p_422) -> (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0)
c  in CNF:
c     b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_2
c     b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_1
c     b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨  b^{1, 423}_0
c  in DIMACS:
 2426 -2427  2428  422 -2429 0
 2426 -2427  2428  422 -2430 0
 2426 -2427  2428  422  2431 0

c  1-1 --> 0
c    (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0 ∧ -p_422) -> (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧ -b^{1, 423}_0)
c  in CNF:
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_2
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_1
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_0
c  in DIMACS:
 2426  2427 -2428  422 -2429 0
 2426  2427 -2428  422 -2430 0
 2426  2427 -2428  422 -2431 0

c  0-1 --> -1
c    (-b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧ -p_422) -> ( b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0)
c  in CNF:
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨  b^{1, 423}_2
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_1
c     b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨  b^{1, 423}_0
c  in DIMACS:
 2426  2427  2428  422  2429 0
 2426  2427  2428  422 -2430 0
 2426  2427  2428  422  2431 0

c  -1-1 --> -2
c    ( b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧  b^{1, 422}_0 ∧ -p_422) -> ( b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0)
c  in CNF:
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨  b^{1, 423}_2
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨  b^{1, 423}_1
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨  p_422 ∨ -b^{1, 423}_0
c  in DIMACS:
-2426  2427 -2428  422  2429 0
-2426  2427 -2428  422  2430 0
-2426  2427 -2428  422 -2431 0

c  -2-1 --> break 
c    ( b^{1, 422}_2 ∧  b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧ -p_422) -> break
c  in CNF:
c    -b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨  b^{1, 422}_0 ∨  p_422 ∨ break
c  in DIMACS:
-2426 -2427  2428  422 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 422}_2 ∧ -b^{1, 422}_1 ∧ -b^{1, 422}_0 ∧ true) 
c  in CNF:
c    -b^{1, 422}_2 ∨  b^{1, 422}_1 ∨  b^{1, 422}_0 ∨ false 
c  in DIMACS:
-2426  2427  2428  0

c  3 does not represent an automaton state.
c    -(-b^{1, 422}_2 ∧  b^{1, 422}_1 ∧  b^{1, 422}_0 ∧ true) 
c  in CNF:
c     b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ false 
c  in DIMACS:
 2426 -2427 -2428  0
c  -3 does not represent an automaton state.
c    -( b^{1, 422}_2 ∧  b^{1, 422}_1 ∧  b^{1, 422}_0 ∧ true) 
c  in CNF:
c    -b^{1, 422}_2 ∨ -b^{1, 422}_1 ∨ -b^{1, 422}_0 ∨ false 
c  in DIMACS:
-2426 -2427 -2428  0

c i = 423
c  -2+1 --> -1
c    ( b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧  p_423) -> ( b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0)
c  in CNF:
c    -b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨  b^{1, 424}_2
c    -b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_1
c    -b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨  b^{1, 424}_0
c  in DIMACS:
-2429 -2430  2431 -423  2432 0
-2429 -2430  2431 -423 -2433 0
-2429 -2430  2431 -423  2434 0

c  -1+1 --> 0
c    ( b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0 ∧  p_423) -> (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧ -b^{1, 424}_0)
c  in CNF:
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_2
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_1
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_0
c  in DIMACS:
-2429  2430 -2431 -423 -2432 0
-2429  2430 -2431 -423 -2433 0
-2429  2430 -2431 -423 -2434 0

c  0+1 --> 1
c    (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧  p_423) -> (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0)
c  in CNF:
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_2
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_1
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨  b^{1, 424}_0
c  in DIMACS:
 2429  2430  2431 -423 -2432 0
 2429  2430  2431 -423 -2433 0
 2429  2430  2431 -423  2434 0

c  1+1 --> 2
c    (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0 ∧  p_423) -> (-b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0)
c  in CNF:
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_2
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨  b^{1, 424}_1
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ -p_423 ∨ -b^{1, 424}_0
c  in DIMACS:
 2429  2430 -2431 -423 -2432 0
 2429  2430 -2431 -423  2433 0
 2429  2430 -2431 -423 -2434 0

c  2+1 --> break 
c    (-b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧  p_423) -> break
c  in CNF:
c     b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ -p_423 ∨ break
c  in DIMACS:
 2429 -2430  2431 -423 1162 0


c  2-1 --> 1
c    (-b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧ -p_423) -> (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0)
c  in CNF:
c     b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_2
c     b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_1
c     b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨  b^{1, 424}_0
c  in DIMACS:
 2429 -2430  2431  423 -2432 0
 2429 -2430  2431  423 -2433 0
 2429 -2430  2431  423  2434 0

c  1-1 --> 0
c    (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0 ∧ -p_423) -> (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧ -b^{1, 424}_0)
c  in CNF:
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_2
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_1
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_0
c  in DIMACS:
 2429  2430 -2431  423 -2432 0
 2429  2430 -2431  423 -2433 0
 2429  2430 -2431  423 -2434 0

c  0-1 --> -1
c    (-b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧ -p_423) -> ( b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0)
c  in CNF:
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨  b^{1, 424}_2
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_1
c     b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨  b^{1, 424}_0
c  in DIMACS:
 2429  2430  2431  423  2432 0
 2429  2430  2431  423 -2433 0
 2429  2430  2431  423  2434 0

c  -1-1 --> -2
c    ( b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧  b^{1, 423}_0 ∧ -p_423) -> ( b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0)
c  in CNF:
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨  b^{1, 424}_2
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨  b^{1, 424}_1
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨  p_423 ∨ -b^{1, 424}_0
c  in DIMACS:
-2429  2430 -2431  423  2432 0
-2429  2430 -2431  423  2433 0
-2429  2430 -2431  423 -2434 0

c  -2-1 --> break 
c    ( b^{1, 423}_2 ∧  b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧ -p_423) -> break
c  in CNF:
c    -b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨  b^{1, 423}_0 ∨  p_423 ∨ break
c  in DIMACS:
-2429 -2430  2431  423 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 423}_2 ∧ -b^{1, 423}_1 ∧ -b^{1, 423}_0 ∧ true) 
c  in CNF:
c    -b^{1, 423}_2 ∨  b^{1, 423}_1 ∨  b^{1, 423}_0 ∨ false 
c  in DIMACS:
-2429  2430  2431  0

c  3 does not represent an automaton state.
c    -(-b^{1, 423}_2 ∧  b^{1, 423}_1 ∧  b^{1, 423}_0 ∧ true) 
c  in CNF:
c     b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ false 
c  in DIMACS:
 2429 -2430 -2431  0
c  -3 does not represent an automaton state.
c    -( b^{1, 423}_2 ∧  b^{1, 423}_1 ∧  b^{1, 423}_0 ∧ true) 
c  in CNF:
c    -b^{1, 423}_2 ∨ -b^{1, 423}_1 ∨ -b^{1, 423}_0 ∨ false 
c  in DIMACS:
-2429 -2430 -2431  0

c i = 424
c  -2+1 --> -1
c    ( b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧  p_424) -> ( b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0)
c  in CNF:
c    -b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨  b^{1, 425}_2
c    -b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_1
c    -b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨  b^{1, 425}_0
c  in DIMACS:
-2432 -2433  2434 -424  2435 0
-2432 -2433  2434 -424 -2436 0
-2432 -2433  2434 -424  2437 0

c  -1+1 --> 0
c    ( b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0 ∧  p_424) -> (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧ -b^{1, 425}_0)
c  in CNF:
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_2
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_1
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_0
c  in DIMACS:
-2432  2433 -2434 -424 -2435 0
-2432  2433 -2434 -424 -2436 0
-2432  2433 -2434 -424 -2437 0

c  0+1 --> 1
c    (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧  p_424) -> (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0)
c  in CNF:
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_2
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_1
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨  b^{1, 425}_0
c  in DIMACS:
 2432  2433  2434 -424 -2435 0
 2432  2433  2434 -424 -2436 0
 2432  2433  2434 -424  2437 0

c  1+1 --> 2
c    (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0 ∧  p_424) -> (-b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0)
c  in CNF:
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_2
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨  b^{1, 425}_1
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ -p_424 ∨ -b^{1, 425}_0
c  in DIMACS:
 2432  2433 -2434 -424 -2435 0
 2432  2433 -2434 -424  2436 0
 2432  2433 -2434 -424 -2437 0

c  2+1 --> break 
c    (-b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧  p_424) -> break
c  in CNF:
c     b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 2432 -2433  2434 -424 1162 0


c  2-1 --> 1
c    (-b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧ -p_424) -> (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0)
c  in CNF:
c     b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_2
c     b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_1
c     b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨  b^{1, 425}_0
c  in DIMACS:
 2432 -2433  2434  424 -2435 0
 2432 -2433  2434  424 -2436 0
 2432 -2433  2434  424  2437 0

c  1-1 --> 0
c    (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0 ∧ -p_424) -> (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧ -b^{1, 425}_0)
c  in CNF:
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_2
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_1
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_0
c  in DIMACS:
 2432  2433 -2434  424 -2435 0
 2432  2433 -2434  424 -2436 0
 2432  2433 -2434  424 -2437 0

c  0-1 --> -1
c    (-b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧ -p_424) -> ( b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0)
c  in CNF:
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨  b^{1, 425}_2
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_1
c     b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨  b^{1, 425}_0
c  in DIMACS:
 2432  2433  2434  424  2435 0
 2432  2433  2434  424 -2436 0
 2432  2433  2434  424  2437 0

c  -1-1 --> -2
c    ( b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧  b^{1, 424}_0 ∧ -p_424) -> ( b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0)
c  in CNF:
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨  b^{1, 425}_2
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨  b^{1, 425}_1
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨  p_424 ∨ -b^{1, 425}_0
c  in DIMACS:
-2432  2433 -2434  424  2435 0
-2432  2433 -2434  424  2436 0
-2432  2433 -2434  424 -2437 0

c  -2-1 --> break 
c    ( b^{1, 424}_2 ∧  b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨  b^{1, 424}_0 ∨  p_424 ∨ break
c  in DIMACS:
-2432 -2433  2434  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 424}_2 ∧ -b^{1, 424}_1 ∧ -b^{1, 424}_0 ∧ true) 
c  in CNF:
c    -b^{1, 424}_2 ∨  b^{1, 424}_1 ∨  b^{1, 424}_0 ∨ false 
c  in DIMACS:
-2432  2433  2434  0

c  3 does not represent an automaton state.
c    -(-b^{1, 424}_2 ∧  b^{1, 424}_1 ∧  b^{1, 424}_0 ∧ true) 
c  in CNF:
c     b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ false 
c  in DIMACS:
 2432 -2433 -2434  0
c  -3 does not represent an automaton state.
c    -( b^{1, 424}_2 ∧  b^{1, 424}_1 ∧  b^{1, 424}_0 ∧ true) 
c  in CNF:
c    -b^{1, 424}_2 ∨ -b^{1, 424}_1 ∨ -b^{1, 424}_0 ∨ false 
c  in DIMACS:
-2432 -2433 -2434  0

c i = 425
c  -2+1 --> -1
c    ( b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧  p_425) -> ( b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0)
c  in CNF:
c    -b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨  b^{1, 426}_2
c    -b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_1
c    -b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨  b^{1, 426}_0
c  in DIMACS:
-2435 -2436  2437 -425  2438 0
-2435 -2436  2437 -425 -2439 0
-2435 -2436  2437 -425  2440 0

c  -1+1 --> 0
c    ( b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0 ∧  p_425) -> (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧ -b^{1, 426}_0)
c  in CNF:
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_2
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_1
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_0
c  in DIMACS:
-2435  2436 -2437 -425 -2438 0
-2435  2436 -2437 -425 -2439 0
-2435  2436 -2437 -425 -2440 0

c  0+1 --> 1
c    (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧  p_425) -> (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0)
c  in CNF:
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_2
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_1
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨  b^{1, 426}_0
c  in DIMACS:
 2435  2436  2437 -425 -2438 0
 2435  2436  2437 -425 -2439 0
 2435  2436  2437 -425  2440 0

c  1+1 --> 2
c    (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0 ∧  p_425) -> (-b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0)
c  in CNF:
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_2
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨  b^{1, 426}_1
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ -p_425 ∨ -b^{1, 426}_0
c  in DIMACS:
 2435  2436 -2437 -425 -2438 0
 2435  2436 -2437 -425  2439 0
 2435  2436 -2437 -425 -2440 0

c  2+1 --> break 
c    (-b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧  p_425) -> break
c  in CNF:
c     b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ -p_425 ∨ break
c  in DIMACS:
 2435 -2436  2437 -425 1162 0


c  2-1 --> 1
c    (-b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧ -p_425) -> (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0)
c  in CNF:
c     b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_2
c     b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_1
c     b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨  b^{1, 426}_0
c  in DIMACS:
 2435 -2436  2437  425 -2438 0
 2435 -2436  2437  425 -2439 0
 2435 -2436  2437  425  2440 0

c  1-1 --> 0
c    (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0 ∧ -p_425) -> (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧ -b^{1, 426}_0)
c  in CNF:
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_2
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_1
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_0
c  in DIMACS:
 2435  2436 -2437  425 -2438 0
 2435  2436 -2437  425 -2439 0
 2435  2436 -2437  425 -2440 0

c  0-1 --> -1
c    (-b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧ -p_425) -> ( b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0)
c  in CNF:
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨  b^{1, 426}_2
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_1
c     b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨  b^{1, 426}_0
c  in DIMACS:
 2435  2436  2437  425  2438 0
 2435  2436  2437  425 -2439 0
 2435  2436  2437  425  2440 0

c  -1-1 --> -2
c    ( b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧  b^{1, 425}_0 ∧ -p_425) -> ( b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0)
c  in CNF:
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨  b^{1, 426}_2
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨  b^{1, 426}_1
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨  p_425 ∨ -b^{1, 426}_0
c  in DIMACS:
-2435  2436 -2437  425  2438 0
-2435  2436 -2437  425  2439 0
-2435  2436 -2437  425 -2440 0

c  -2-1 --> break 
c    ( b^{1, 425}_2 ∧  b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧ -p_425) -> break
c  in CNF:
c    -b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨  b^{1, 425}_0 ∨  p_425 ∨ break
c  in DIMACS:
-2435 -2436  2437  425 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 425}_2 ∧ -b^{1, 425}_1 ∧ -b^{1, 425}_0 ∧ true) 
c  in CNF:
c    -b^{1, 425}_2 ∨  b^{1, 425}_1 ∨  b^{1, 425}_0 ∨ false 
c  in DIMACS:
-2435  2436  2437  0

c  3 does not represent an automaton state.
c    -(-b^{1, 425}_2 ∧  b^{1, 425}_1 ∧  b^{1, 425}_0 ∧ true) 
c  in CNF:
c     b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ false 
c  in DIMACS:
 2435 -2436 -2437  0
c  -3 does not represent an automaton state.
c    -( b^{1, 425}_2 ∧  b^{1, 425}_1 ∧  b^{1, 425}_0 ∧ true) 
c  in CNF:
c    -b^{1, 425}_2 ∨ -b^{1, 425}_1 ∨ -b^{1, 425}_0 ∨ false 
c  in DIMACS:
-2435 -2436 -2437  0

c i = 426
c  -2+1 --> -1
c    ( b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧  p_426) -> ( b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0)
c  in CNF:
c    -b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨  b^{1, 427}_2
c    -b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_1
c    -b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨  b^{1, 427}_0
c  in DIMACS:
-2438 -2439  2440 -426  2441 0
-2438 -2439  2440 -426 -2442 0
-2438 -2439  2440 -426  2443 0

c  -1+1 --> 0
c    ( b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0 ∧  p_426) -> (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧ -b^{1, 427}_0)
c  in CNF:
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_2
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_1
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_0
c  in DIMACS:
-2438  2439 -2440 -426 -2441 0
-2438  2439 -2440 -426 -2442 0
-2438  2439 -2440 -426 -2443 0

c  0+1 --> 1
c    (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧  p_426) -> (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0)
c  in CNF:
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_2
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_1
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨  b^{1, 427}_0
c  in DIMACS:
 2438  2439  2440 -426 -2441 0
 2438  2439  2440 -426 -2442 0
 2438  2439  2440 -426  2443 0

c  1+1 --> 2
c    (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0 ∧  p_426) -> (-b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0)
c  in CNF:
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_2
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨  b^{1, 427}_1
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ -p_426 ∨ -b^{1, 427}_0
c  in DIMACS:
 2438  2439 -2440 -426 -2441 0
 2438  2439 -2440 -426  2442 0
 2438  2439 -2440 -426 -2443 0

c  2+1 --> break 
c    (-b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧  p_426) -> break
c  in CNF:
c     b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 2438 -2439  2440 -426 1162 0


c  2-1 --> 1
c    (-b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧ -p_426) -> (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0)
c  in CNF:
c     b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_2
c     b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_1
c     b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨  b^{1, 427}_0
c  in DIMACS:
 2438 -2439  2440  426 -2441 0
 2438 -2439  2440  426 -2442 0
 2438 -2439  2440  426  2443 0

c  1-1 --> 0
c    (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0 ∧ -p_426) -> (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧ -b^{1, 427}_0)
c  in CNF:
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_2
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_1
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_0
c  in DIMACS:
 2438  2439 -2440  426 -2441 0
 2438  2439 -2440  426 -2442 0
 2438  2439 -2440  426 -2443 0

c  0-1 --> -1
c    (-b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧ -p_426) -> ( b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0)
c  in CNF:
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨  b^{1, 427}_2
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_1
c     b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨  b^{1, 427}_0
c  in DIMACS:
 2438  2439  2440  426  2441 0
 2438  2439  2440  426 -2442 0
 2438  2439  2440  426  2443 0

c  -1-1 --> -2
c    ( b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧  b^{1, 426}_0 ∧ -p_426) -> ( b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0)
c  in CNF:
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨  b^{1, 427}_2
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨  b^{1, 427}_1
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨  p_426 ∨ -b^{1, 427}_0
c  in DIMACS:
-2438  2439 -2440  426  2441 0
-2438  2439 -2440  426  2442 0
-2438  2439 -2440  426 -2443 0

c  -2-1 --> break 
c    ( b^{1, 426}_2 ∧  b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨  b^{1, 426}_0 ∨  p_426 ∨ break
c  in DIMACS:
-2438 -2439  2440  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 426}_2 ∧ -b^{1, 426}_1 ∧ -b^{1, 426}_0 ∧ true) 
c  in CNF:
c    -b^{1, 426}_2 ∨  b^{1, 426}_1 ∨  b^{1, 426}_0 ∨ false 
c  in DIMACS:
-2438  2439  2440  0

c  3 does not represent an automaton state.
c    -(-b^{1, 426}_2 ∧  b^{1, 426}_1 ∧  b^{1, 426}_0 ∧ true) 
c  in CNF:
c     b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ false 
c  in DIMACS:
 2438 -2439 -2440  0
c  -3 does not represent an automaton state.
c    -( b^{1, 426}_2 ∧  b^{1, 426}_1 ∧  b^{1, 426}_0 ∧ true) 
c  in CNF:
c    -b^{1, 426}_2 ∨ -b^{1, 426}_1 ∨ -b^{1, 426}_0 ∨ false 
c  in DIMACS:
-2438 -2439 -2440  0

c i = 427
c  -2+1 --> -1
c    ( b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧  p_427) -> ( b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0)
c  in CNF:
c    -b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨  b^{1, 428}_2
c    -b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_1
c    -b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨  b^{1, 428}_0
c  in DIMACS:
-2441 -2442  2443 -427  2444 0
-2441 -2442  2443 -427 -2445 0
-2441 -2442  2443 -427  2446 0

c  -1+1 --> 0
c    ( b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0 ∧  p_427) -> (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧ -b^{1, 428}_0)
c  in CNF:
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_2
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_1
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_0
c  in DIMACS:
-2441  2442 -2443 -427 -2444 0
-2441  2442 -2443 -427 -2445 0
-2441  2442 -2443 -427 -2446 0

c  0+1 --> 1
c    (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧  p_427) -> (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0)
c  in CNF:
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_2
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_1
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨  b^{1, 428}_0
c  in DIMACS:
 2441  2442  2443 -427 -2444 0
 2441  2442  2443 -427 -2445 0
 2441  2442  2443 -427  2446 0

c  1+1 --> 2
c    (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0 ∧  p_427) -> (-b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0)
c  in CNF:
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_2
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨  b^{1, 428}_1
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ -p_427 ∨ -b^{1, 428}_0
c  in DIMACS:
 2441  2442 -2443 -427 -2444 0
 2441  2442 -2443 -427  2445 0
 2441  2442 -2443 -427 -2446 0

c  2+1 --> break 
c    (-b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧  p_427) -> break
c  in CNF:
c     b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ -p_427 ∨ break
c  in DIMACS:
 2441 -2442  2443 -427 1162 0


c  2-1 --> 1
c    (-b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧ -p_427) -> (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0)
c  in CNF:
c     b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_2
c     b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_1
c     b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨  b^{1, 428}_0
c  in DIMACS:
 2441 -2442  2443  427 -2444 0
 2441 -2442  2443  427 -2445 0
 2441 -2442  2443  427  2446 0

c  1-1 --> 0
c    (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0 ∧ -p_427) -> (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧ -b^{1, 428}_0)
c  in CNF:
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_2
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_1
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_0
c  in DIMACS:
 2441  2442 -2443  427 -2444 0
 2441  2442 -2443  427 -2445 0
 2441  2442 -2443  427 -2446 0

c  0-1 --> -1
c    (-b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧ -p_427) -> ( b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0)
c  in CNF:
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨  b^{1, 428}_2
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_1
c     b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨  b^{1, 428}_0
c  in DIMACS:
 2441  2442  2443  427  2444 0
 2441  2442  2443  427 -2445 0
 2441  2442  2443  427  2446 0

c  -1-1 --> -2
c    ( b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧  b^{1, 427}_0 ∧ -p_427) -> ( b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0)
c  in CNF:
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨  b^{1, 428}_2
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨  b^{1, 428}_1
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨  p_427 ∨ -b^{1, 428}_0
c  in DIMACS:
-2441  2442 -2443  427  2444 0
-2441  2442 -2443  427  2445 0
-2441  2442 -2443  427 -2446 0

c  -2-1 --> break 
c    ( b^{1, 427}_2 ∧  b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧ -p_427) -> break
c  in CNF:
c    -b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨  b^{1, 427}_0 ∨  p_427 ∨ break
c  in DIMACS:
-2441 -2442  2443  427 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 427}_2 ∧ -b^{1, 427}_1 ∧ -b^{1, 427}_0 ∧ true) 
c  in CNF:
c    -b^{1, 427}_2 ∨  b^{1, 427}_1 ∨  b^{1, 427}_0 ∨ false 
c  in DIMACS:
-2441  2442  2443  0

c  3 does not represent an automaton state.
c    -(-b^{1, 427}_2 ∧  b^{1, 427}_1 ∧  b^{1, 427}_0 ∧ true) 
c  in CNF:
c     b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ false 
c  in DIMACS:
 2441 -2442 -2443  0
c  -3 does not represent an automaton state.
c    -( b^{1, 427}_2 ∧  b^{1, 427}_1 ∧  b^{1, 427}_0 ∧ true) 
c  in CNF:
c    -b^{1, 427}_2 ∨ -b^{1, 427}_1 ∨ -b^{1, 427}_0 ∨ false 
c  in DIMACS:
-2441 -2442 -2443  0

c i = 428
c  -2+1 --> -1
c    ( b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧  p_428) -> ( b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0)
c  in CNF:
c    -b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨  b^{1, 429}_2
c    -b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_1
c    -b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨  b^{1, 429}_0
c  in DIMACS:
-2444 -2445  2446 -428  2447 0
-2444 -2445  2446 -428 -2448 0
-2444 -2445  2446 -428  2449 0

c  -1+1 --> 0
c    ( b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0 ∧  p_428) -> (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧ -b^{1, 429}_0)
c  in CNF:
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_2
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_1
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_0
c  in DIMACS:
-2444  2445 -2446 -428 -2447 0
-2444  2445 -2446 -428 -2448 0
-2444  2445 -2446 -428 -2449 0

c  0+1 --> 1
c    (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧  p_428) -> (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0)
c  in CNF:
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_2
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_1
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨  b^{1, 429}_0
c  in DIMACS:
 2444  2445  2446 -428 -2447 0
 2444  2445  2446 -428 -2448 0
 2444  2445  2446 -428  2449 0

c  1+1 --> 2
c    (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0 ∧  p_428) -> (-b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0)
c  in CNF:
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_2
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨  b^{1, 429}_1
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ -p_428 ∨ -b^{1, 429}_0
c  in DIMACS:
 2444  2445 -2446 -428 -2447 0
 2444  2445 -2446 -428  2448 0
 2444  2445 -2446 -428 -2449 0

c  2+1 --> break 
c    (-b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧  p_428) -> break
c  in CNF:
c     b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ -p_428 ∨ break
c  in DIMACS:
 2444 -2445  2446 -428 1162 0


c  2-1 --> 1
c    (-b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧ -p_428) -> (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0)
c  in CNF:
c     b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_2
c     b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_1
c     b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨  b^{1, 429}_0
c  in DIMACS:
 2444 -2445  2446  428 -2447 0
 2444 -2445  2446  428 -2448 0
 2444 -2445  2446  428  2449 0

c  1-1 --> 0
c    (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0 ∧ -p_428) -> (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧ -b^{1, 429}_0)
c  in CNF:
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_2
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_1
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_0
c  in DIMACS:
 2444  2445 -2446  428 -2447 0
 2444  2445 -2446  428 -2448 0
 2444  2445 -2446  428 -2449 0

c  0-1 --> -1
c    (-b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧ -p_428) -> ( b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0)
c  in CNF:
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨  b^{1, 429}_2
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_1
c     b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨  b^{1, 429}_0
c  in DIMACS:
 2444  2445  2446  428  2447 0
 2444  2445  2446  428 -2448 0
 2444  2445  2446  428  2449 0

c  -1-1 --> -2
c    ( b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧  b^{1, 428}_0 ∧ -p_428) -> ( b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0)
c  in CNF:
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨  b^{1, 429}_2
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨  b^{1, 429}_1
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨  p_428 ∨ -b^{1, 429}_0
c  in DIMACS:
-2444  2445 -2446  428  2447 0
-2444  2445 -2446  428  2448 0
-2444  2445 -2446  428 -2449 0

c  -2-1 --> break 
c    ( b^{1, 428}_2 ∧  b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧ -p_428) -> break
c  in CNF:
c    -b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨  b^{1, 428}_0 ∨  p_428 ∨ break
c  in DIMACS:
-2444 -2445  2446  428 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 428}_2 ∧ -b^{1, 428}_1 ∧ -b^{1, 428}_0 ∧ true) 
c  in CNF:
c    -b^{1, 428}_2 ∨  b^{1, 428}_1 ∨  b^{1, 428}_0 ∨ false 
c  in DIMACS:
-2444  2445  2446  0

c  3 does not represent an automaton state.
c    -(-b^{1, 428}_2 ∧  b^{1, 428}_1 ∧  b^{1, 428}_0 ∧ true) 
c  in CNF:
c     b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ false 
c  in DIMACS:
 2444 -2445 -2446  0
c  -3 does not represent an automaton state.
c    -( b^{1, 428}_2 ∧  b^{1, 428}_1 ∧  b^{1, 428}_0 ∧ true) 
c  in CNF:
c    -b^{1, 428}_2 ∨ -b^{1, 428}_1 ∨ -b^{1, 428}_0 ∨ false 
c  in DIMACS:
-2444 -2445 -2446  0

c i = 429
c  -2+1 --> -1
c    ( b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧  p_429) -> ( b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0)
c  in CNF:
c    -b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨  b^{1, 430}_2
c    -b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_1
c    -b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨  b^{1, 430}_0
c  in DIMACS:
-2447 -2448  2449 -429  2450 0
-2447 -2448  2449 -429 -2451 0
-2447 -2448  2449 -429  2452 0

c  -1+1 --> 0
c    ( b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0 ∧  p_429) -> (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧ -b^{1, 430}_0)
c  in CNF:
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_2
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_1
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_0
c  in DIMACS:
-2447  2448 -2449 -429 -2450 0
-2447  2448 -2449 -429 -2451 0
-2447  2448 -2449 -429 -2452 0

c  0+1 --> 1
c    (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧  p_429) -> (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0)
c  in CNF:
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_2
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_1
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨  b^{1, 430}_0
c  in DIMACS:
 2447  2448  2449 -429 -2450 0
 2447  2448  2449 -429 -2451 0
 2447  2448  2449 -429  2452 0

c  1+1 --> 2
c    (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0 ∧  p_429) -> (-b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0)
c  in CNF:
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_2
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨  b^{1, 430}_1
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ -p_429 ∨ -b^{1, 430}_0
c  in DIMACS:
 2447  2448 -2449 -429 -2450 0
 2447  2448 -2449 -429  2451 0
 2447  2448 -2449 -429 -2452 0

c  2+1 --> break 
c    (-b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧  p_429) -> break
c  in CNF:
c     b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 2447 -2448  2449 -429 1162 0


c  2-1 --> 1
c    (-b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧ -p_429) -> (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0)
c  in CNF:
c     b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_2
c     b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_1
c     b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨  b^{1, 430}_0
c  in DIMACS:
 2447 -2448  2449  429 -2450 0
 2447 -2448  2449  429 -2451 0
 2447 -2448  2449  429  2452 0

c  1-1 --> 0
c    (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0 ∧ -p_429) -> (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧ -b^{1, 430}_0)
c  in CNF:
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_2
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_1
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_0
c  in DIMACS:
 2447  2448 -2449  429 -2450 0
 2447  2448 -2449  429 -2451 0
 2447  2448 -2449  429 -2452 0

c  0-1 --> -1
c    (-b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧ -p_429) -> ( b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0)
c  in CNF:
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨  b^{1, 430}_2
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_1
c     b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨  b^{1, 430}_0
c  in DIMACS:
 2447  2448  2449  429  2450 0
 2447  2448  2449  429 -2451 0
 2447  2448  2449  429  2452 0

c  -1-1 --> -2
c    ( b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧  b^{1, 429}_0 ∧ -p_429) -> ( b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0)
c  in CNF:
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨  b^{1, 430}_2
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨  b^{1, 430}_1
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨  p_429 ∨ -b^{1, 430}_0
c  in DIMACS:
-2447  2448 -2449  429  2450 0
-2447  2448 -2449  429  2451 0
-2447  2448 -2449  429 -2452 0

c  -2-1 --> break 
c    ( b^{1, 429}_2 ∧  b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨  b^{1, 429}_0 ∨  p_429 ∨ break
c  in DIMACS:
-2447 -2448  2449  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 429}_2 ∧ -b^{1, 429}_1 ∧ -b^{1, 429}_0 ∧ true) 
c  in CNF:
c    -b^{1, 429}_2 ∨  b^{1, 429}_1 ∨  b^{1, 429}_0 ∨ false 
c  in DIMACS:
-2447  2448  2449  0

c  3 does not represent an automaton state.
c    -(-b^{1, 429}_2 ∧  b^{1, 429}_1 ∧  b^{1, 429}_0 ∧ true) 
c  in CNF:
c     b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ false 
c  in DIMACS:
 2447 -2448 -2449  0
c  -3 does not represent an automaton state.
c    -( b^{1, 429}_2 ∧  b^{1, 429}_1 ∧  b^{1, 429}_0 ∧ true) 
c  in CNF:
c    -b^{1, 429}_2 ∨ -b^{1, 429}_1 ∨ -b^{1, 429}_0 ∨ false 
c  in DIMACS:
-2447 -2448 -2449  0

c i = 430
c  -2+1 --> -1
c    ( b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧  p_430) -> ( b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0)
c  in CNF:
c    -b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨  b^{1, 431}_2
c    -b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_1
c    -b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨  b^{1, 431}_0
c  in DIMACS:
-2450 -2451  2452 -430  2453 0
-2450 -2451  2452 -430 -2454 0
-2450 -2451  2452 -430  2455 0

c  -1+1 --> 0
c    ( b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0 ∧  p_430) -> (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧ -b^{1, 431}_0)
c  in CNF:
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_2
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_1
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_0
c  in DIMACS:
-2450  2451 -2452 -430 -2453 0
-2450  2451 -2452 -430 -2454 0
-2450  2451 -2452 -430 -2455 0

c  0+1 --> 1
c    (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧  p_430) -> (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0)
c  in CNF:
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_2
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_1
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨  b^{1, 431}_0
c  in DIMACS:
 2450  2451  2452 -430 -2453 0
 2450  2451  2452 -430 -2454 0
 2450  2451  2452 -430  2455 0

c  1+1 --> 2
c    (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0 ∧  p_430) -> (-b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0)
c  in CNF:
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_2
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨  b^{1, 431}_1
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ -p_430 ∨ -b^{1, 431}_0
c  in DIMACS:
 2450  2451 -2452 -430 -2453 0
 2450  2451 -2452 -430  2454 0
 2450  2451 -2452 -430 -2455 0

c  2+1 --> break 
c    (-b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧  p_430) -> break
c  in CNF:
c     b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 2450 -2451  2452 -430 1162 0


c  2-1 --> 1
c    (-b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧ -p_430) -> (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0)
c  in CNF:
c     b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_2
c     b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_1
c     b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨  b^{1, 431}_0
c  in DIMACS:
 2450 -2451  2452  430 -2453 0
 2450 -2451  2452  430 -2454 0
 2450 -2451  2452  430  2455 0

c  1-1 --> 0
c    (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0 ∧ -p_430) -> (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧ -b^{1, 431}_0)
c  in CNF:
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_2
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_1
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_0
c  in DIMACS:
 2450  2451 -2452  430 -2453 0
 2450  2451 -2452  430 -2454 0
 2450  2451 -2452  430 -2455 0

c  0-1 --> -1
c    (-b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧ -p_430) -> ( b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0)
c  in CNF:
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨  b^{1, 431}_2
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_1
c     b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨  b^{1, 431}_0
c  in DIMACS:
 2450  2451  2452  430  2453 0
 2450  2451  2452  430 -2454 0
 2450  2451  2452  430  2455 0

c  -1-1 --> -2
c    ( b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧  b^{1, 430}_0 ∧ -p_430) -> ( b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0)
c  in CNF:
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨  b^{1, 431}_2
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨  b^{1, 431}_1
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨  p_430 ∨ -b^{1, 431}_0
c  in DIMACS:
-2450  2451 -2452  430  2453 0
-2450  2451 -2452  430  2454 0
-2450  2451 -2452  430 -2455 0

c  -2-1 --> break 
c    ( b^{1, 430}_2 ∧  b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨  b^{1, 430}_0 ∨  p_430 ∨ break
c  in DIMACS:
-2450 -2451  2452  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 430}_2 ∧ -b^{1, 430}_1 ∧ -b^{1, 430}_0 ∧ true) 
c  in CNF:
c    -b^{1, 430}_2 ∨  b^{1, 430}_1 ∨  b^{1, 430}_0 ∨ false 
c  in DIMACS:
-2450  2451  2452  0

c  3 does not represent an automaton state.
c    -(-b^{1, 430}_2 ∧  b^{1, 430}_1 ∧  b^{1, 430}_0 ∧ true) 
c  in CNF:
c     b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ false 
c  in DIMACS:
 2450 -2451 -2452  0
c  -3 does not represent an automaton state.
c    -( b^{1, 430}_2 ∧  b^{1, 430}_1 ∧  b^{1, 430}_0 ∧ true) 
c  in CNF:
c    -b^{1, 430}_2 ∨ -b^{1, 430}_1 ∨ -b^{1, 430}_0 ∨ false 
c  in DIMACS:
-2450 -2451 -2452  0

c i = 431
c  -2+1 --> -1
c    ( b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧  p_431) -> ( b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0)
c  in CNF:
c    -b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨  b^{1, 432}_2
c    -b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_1
c    -b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨  b^{1, 432}_0
c  in DIMACS:
-2453 -2454  2455 -431  2456 0
-2453 -2454  2455 -431 -2457 0
-2453 -2454  2455 -431  2458 0

c  -1+1 --> 0
c    ( b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0 ∧  p_431) -> (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧ -b^{1, 432}_0)
c  in CNF:
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_2
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_1
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_0
c  in DIMACS:
-2453  2454 -2455 -431 -2456 0
-2453  2454 -2455 -431 -2457 0
-2453  2454 -2455 -431 -2458 0

c  0+1 --> 1
c    (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧  p_431) -> (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0)
c  in CNF:
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_2
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_1
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨  b^{1, 432}_0
c  in DIMACS:
 2453  2454  2455 -431 -2456 0
 2453  2454  2455 -431 -2457 0
 2453  2454  2455 -431  2458 0

c  1+1 --> 2
c    (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0 ∧  p_431) -> (-b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0)
c  in CNF:
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_2
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨  b^{1, 432}_1
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ -p_431 ∨ -b^{1, 432}_0
c  in DIMACS:
 2453  2454 -2455 -431 -2456 0
 2453  2454 -2455 -431  2457 0
 2453  2454 -2455 -431 -2458 0

c  2+1 --> break 
c    (-b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧  p_431) -> break
c  in CNF:
c     b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ -p_431 ∨ break
c  in DIMACS:
 2453 -2454  2455 -431 1162 0


c  2-1 --> 1
c    (-b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧ -p_431) -> (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0)
c  in CNF:
c     b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_2
c     b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_1
c     b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨  b^{1, 432}_0
c  in DIMACS:
 2453 -2454  2455  431 -2456 0
 2453 -2454  2455  431 -2457 0
 2453 -2454  2455  431  2458 0

c  1-1 --> 0
c    (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0 ∧ -p_431) -> (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧ -b^{1, 432}_0)
c  in CNF:
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_2
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_1
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_0
c  in DIMACS:
 2453  2454 -2455  431 -2456 0
 2453  2454 -2455  431 -2457 0
 2453  2454 -2455  431 -2458 0

c  0-1 --> -1
c    (-b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧ -p_431) -> ( b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0)
c  in CNF:
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨  b^{1, 432}_2
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_1
c     b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨  b^{1, 432}_0
c  in DIMACS:
 2453  2454  2455  431  2456 0
 2453  2454  2455  431 -2457 0
 2453  2454  2455  431  2458 0

c  -1-1 --> -2
c    ( b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧  b^{1, 431}_0 ∧ -p_431) -> ( b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0)
c  in CNF:
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨  b^{1, 432}_2
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨  b^{1, 432}_1
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨  p_431 ∨ -b^{1, 432}_0
c  in DIMACS:
-2453  2454 -2455  431  2456 0
-2453  2454 -2455  431  2457 0
-2453  2454 -2455  431 -2458 0

c  -2-1 --> break 
c    ( b^{1, 431}_2 ∧  b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧ -p_431) -> break
c  in CNF:
c    -b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨  b^{1, 431}_0 ∨  p_431 ∨ break
c  in DIMACS:
-2453 -2454  2455  431 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 431}_2 ∧ -b^{1, 431}_1 ∧ -b^{1, 431}_0 ∧ true) 
c  in CNF:
c    -b^{1, 431}_2 ∨  b^{1, 431}_1 ∨  b^{1, 431}_0 ∨ false 
c  in DIMACS:
-2453  2454  2455  0

c  3 does not represent an automaton state.
c    -(-b^{1, 431}_2 ∧  b^{1, 431}_1 ∧  b^{1, 431}_0 ∧ true) 
c  in CNF:
c     b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ false 
c  in DIMACS:
 2453 -2454 -2455  0
c  -3 does not represent an automaton state.
c    -( b^{1, 431}_2 ∧  b^{1, 431}_1 ∧  b^{1, 431}_0 ∧ true) 
c  in CNF:
c    -b^{1, 431}_2 ∨ -b^{1, 431}_1 ∨ -b^{1, 431}_0 ∨ false 
c  in DIMACS:
-2453 -2454 -2455  0

c i = 432
c  -2+1 --> -1
c    ( b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧  p_432) -> ( b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0)
c  in CNF:
c    -b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨  b^{1, 433}_2
c    -b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_1
c    -b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨  b^{1, 433}_0
c  in DIMACS:
-2456 -2457  2458 -432  2459 0
-2456 -2457  2458 -432 -2460 0
-2456 -2457  2458 -432  2461 0

c  -1+1 --> 0
c    ( b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0 ∧  p_432) -> (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧ -b^{1, 433}_0)
c  in CNF:
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_2
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_1
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_0
c  in DIMACS:
-2456  2457 -2458 -432 -2459 0
-2456  2457 -2458 -432 -2460 0
-2456  2457 -2458 -432 -2461 0

c  0+1 --> 1
c    (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧  p_432) -> (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0)
c  in CNF:
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_2
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_1
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨  b^{1, 433}_0
c  in DIMACS:
 2456  2457  2458 -432 -2459 0
 2456  2457  2458 -432 -2460 0
 2456  2457  2458 -432  2461 0

c  1+1 --> 2
c    (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0 ∧  p_432) -> (-b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0)
c  in CNF:
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_2
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨  b^{1, 433}_1
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ -p_432 ∨ -b^{1, 433}_0
c  in DIMACS:
 2456  2457 -2458 -432 -2459 0
 2456  2457 -2458 -432  2460 0
 2456  2457 -2458 -432 -2461 0

c  2+1 --> break 
c    (-b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧  p_432) -> break
c  in CNF:
c     b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 2456 -2457  2458 -432 1162 0


c  2-1 --> 1
c    (-b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧ -p_432) -> (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0)
c  in CNF:
c     b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_2
c     b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_1
c     b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨  b^{1, 433}_0
c  in DIMACS:
 2456 -2457  2458  432 -2459 0
 2456 -2457  2458  432 -2460 0
 2456 -2457  2458  432  2461 0

c  1-1 --> 0
c    (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0 ∧ -p_432) -> (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧ -b^{1, 433}_0)
c  in CNF:
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_2
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_1
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_0
c  in DIMACS:
 2456  2457 -2458  432 -2459 0
 2456  2457 -2458  432 -2460 0
 2456  2457 -2458  432 -2461 0

c  0-1 --> -1
c    (-b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧ -p_432) -> ( b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0)
c  in CNF:
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨  b^{1, 433}_2
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_1
c     b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨  b^{1, 433}_0
c  in DIMACS:
 2456  2457  2458  432  2459 0
 2456  2457  2458  432 -2460 0
 2456  2457  2458  432  2461 0

c  -1-1 --> -2
c    ( b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧  b^{1, 432}_0 ∧ -p_432) -> ( b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0)
c  in CNF:
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨  b^{1, 433}_2
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨  b^{1, 433}_1
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨  p_432 ∨ -b^{1, 433}_0
c  in DIMACS:
-2456  2457 -2458  432  2459 0
-2456  2457 -2458  432  2460 0
-2456  2457 -2458  432 -2461 0

c  -2-1 --> break 
c    ( b^{1, 432}_2 ∧  b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨  b^{1, 432}_0 ∨  p_432 ∨ break
c  in DIMACS:
-2456 -2457  2458  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 432}_2 ∧ -b^{1, 432}_1 ∧ -b^{1, 432}_0 ∧ true) 
c  in CNF:
c    -b^{1, 432}_2 ∨  b^{1, 432}_1 ∨  b^{1, 432}_0 ∨ false 
c  in DIMACS:
-2456  2457  2458  0

c  3 does not represent an automaton state.
c    -(-b^{1, 432}_2 ∧  b^{1, 432}_1 ∧  b^{1, 432}_0 ∧ true) 
c  in CNF:
c     b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ false 
c  in DIMACS:
 2456 -2457 -2458  0
c  -3 does not represent an automaton state.
c    -( b^{1, 432}_2 ∧  b^{1, 432}_1 ∧  b^{1, 432}_0 ∧ true) 
c  in CNF:
c    -b^{1, 432}_2 ∨ -b^{1, 432}_1 ∨ -b^{1, 432}_0 ∨ false 
c  in DIMACS:
-2456 -2457 -2458  0

c i = 433
c  -2+1 --> -1
c    ( b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧  p_433) -> ( b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0)
c  in CNF:
c    -b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨  b^{1, 434}_2
c    -b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_1
c    -b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨  b^{1, 434}_0
c  in DIMACS:
-2459 -2460  2461 -433  2462 0
-2459 -2460  2461 -433 -2463 0
-2459 -2460  2461 -433  2464 0

c  -1+1 --> 0
c    ( b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0 ∧  p_433) -> (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧ -b^{1, 434}_0)
c  in CNF:
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_2
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_1
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_0
c  in DIMACS:
-2459  2460 -2461 -433 -2462 0
-2459  2460 -2461 -433 -2463 0
-2459  2460 -2461 -433 -2464 0

c  0+1 --> 1
c    (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧  p_433) -> (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0)
c  in CNF:
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_2
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_1
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨  b^{1, 434}_0
c  in DIMACS:
 2459  2460  2461 -433 -2462 0
 2459  2460  2461 -433 -2463 0
 2459  2460  2461 -433  2464 0

c  1+1 --> 2
c    (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0 ∧  p_433) -> (-b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0)
c  in CNF:
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_2
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨  b^{1, 434}_1
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ -p_433 ∨ -b^{1, 434}_0
c  in DIMACS:
 2459  2460 -2461 -433 -2462 0
 2459  2460 -2461 -433  2463 0
 2459  2460 -2461 -433 -2464 0

c  2+1 --> break 
c    (-b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧  p_433) -> break
c  in CNF:
c     b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ -p_433 ∨ break
c  in DIMACS:
 2459 -2460  2461 -433 1162 0


c  2-1 --> 1
c    (-b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧ -p_433) -> (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0)
c  in CNF:
c     b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_2
c     b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_1
c     b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨  b^{1, 434}_0
c  in DIMACS:
 2459 -2460  2461  433 -2462 0
 2459 -2460  2461  433 -2463 0
 2459 -2460  2461  433  2464 0

c  1-1 --> 0
c    (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0 ∧ -p_433) -> (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧ -b^{1, 434}_0)
c  in CNF:
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_2
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_1
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_0
c  in DIMACS:
 2459  2460 -2461  433 -2462 0
 2459  2460 -2461  433 -2463 0
 2459  2460 -2461  433 -2464 0

c  0-1 --> -1
c    (-b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧ -p_433) -> ( b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0)
c  in CNF:
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨  b^{1, 434}_2
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_1
c     b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨  b^{1, 434}_0
c  in DIMACS:
 2459  2460  2461  433  2462 0
 2459  2460  2461  433 -2463 0
 2459  2460  2461  433  2464 0

c  -1-1 --> -2
c    ( b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧  b^{1, 433}_0 ∧ -p_433) -> ( b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0)
c  in CNF:
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨  b^{1, 434}_2
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨  b^{1, 434}_1
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨  p_433 ∨ -b^{1, 434}_0
c  in DIMACS:
-2459  2460 -2461  433  2462 0
-2459  2460 -2461  433  2463 0
-2459  2460 -2461  433 -2464 0

c  -2-1 --> break 
c    ( b^{1, 433}_2 ∧  b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧ -p_433) -> break
c  in CNF:
c    -b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨  b^{1, 433}_0 ∨  p_433 ∨ break
c  in DIMACS:
-2459 -2460  2461  433 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 433}_2 ∧ -b^{1, 433}_1 ∧ -b^{1, 433}_0 ∧ true) 
c  in CNF:
c    -b^{1, 433}_2 ∨  b^{1, 433}_1 ∨  b^{1, 433}_0 ∨ false 
c  in DIMACS:
-2459  2460  2461  0

c  3 does not represent an automaton state.
c    -(-b^{1, 433}_2 ∧  b^{1, 433}_1 ∧  b^{1, 433}_0 ∧ true) 
c  in CNF:
c     b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ false 
c  in DIMACS:
 2459 -2460 -2461  0
c  -3 does not represent an automaton state.
c    -( b^{1, 433}_2 ∧  b^{1, 433}_1 ∧  b^{1, 433}_0 ∧ true) 
c  in CNF:
c    -b^{1, 433}_2 ∨ -b^{1, 433}_1 ∨ -b^{1, 433}_0 ∨ false 
c  in DIMACS:
-2459 -2460 -2461  0

c i = 434
c  -2+1 --> -1
c    ( b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧  p_434) -> ( b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0)
c  in CNF:
c    -b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨  b^{1, 435}_2
c    -b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_1
c    -b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨  b^{1, 435}_0
c  in DIMACS:
-2462 -2463  2464 -434  2465 0
-2462 -2463  2464 -434 -2466 0
-2462 -2463  2464 -434  2467 0

c  -1+1 --> 0
c    ( b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0 ∧  p_434) -> (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧ -b^{1, 435}_0)
c  in CNF:
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_2
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_1
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_0
c  in DIMACS:
-2462  2463 -2464 -434 -2465 0
-2462  2463 -2464 -434 -2466 0
-2462  2463 -2464 -434 -2467 0

c  0+1 --> 1
c    (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧  p_434) -> (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0)
c  in CNF:
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_2
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_1
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨  b^{1, 435}_0
c  in DIMACS:
 2462  2463  2464 -434 -2465 0
 2462  2463  2464 -434 -2466 0
 2462  2463  2464 -434  2467 0

c  1+1 --> 2
c    (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0 ∧  p_434) -> (-b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0)
c  in CNF:
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_2
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨  b^{1, 435}_1
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ -p_434 ∨ -b^{1, 435}_0
c  in DIMACS:
 2462  2463 -2464 -434 -2465 0
 2462  2463 -2464 -434  2466 0
 2462  2463 -2464 -434 -2467 0

c  2+1 --> break 
c    (-b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧  p_434) -> break
c  in CNF:
c     b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 2462 -2463  2464 -434 1162 0


c  2-1 --> 1
c    (-b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧ -p_434) -> (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0)
c  in CNF:
c     b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_2
c     b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_1
c     b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨  b^{1, 435}_0
c  in DIMACS:
 2462 -2463  2464  434 -2465 0
 2462 -2463  2464  434 -2466 0
 2462 -2463  2464  434  2467 0

c  1-1 --> 0
c    (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0 ∧ -p_434) -> (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧ -b^{1, 435}_0)
c  in CNF:
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_2
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_1
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_0
c  in DIMACS:
 2462  2463 -2464  434 -2465 0
 2462  2463 -2464  434 -2466 0
 2462  2463 -2464  434 -2467 0

c  0-1 --> -1
c    (-b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧ -p_434) -> ( b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0)
c  in CNF:
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨  b^{1, 435}_2
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_1
c     b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨  b^{1, 435}_0
c  in DIMACS:
 2462  2463  2464  434  2465 0
 2462  2463  2464  434 -2466 0
 2462  2463  2464  434  2467 0

c  -1-1 --> -2
c    ( b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧  b^{1, 434}_0 ∧ -p_434) -> ( b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0)
c  in CNF:
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨  b^{1, 435}_2
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨  b^{1, 435}_1
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨  p_434 ∨ -b^{1, 435}_0
c  in DIMACS:
-2462  2463 -2464  434  2465 0
-2462  2463 -2464  434  2466 0
-2462  2463 -2464  434 -2467 0

c  -2-1 --> break 
c    ( b^{1, 434}_2 ∧  b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨  b^{1, 434}_0 ∨  p_434 ∨ break
c  in DIMACS:
-2462 -2463  2464  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 434}_2 ∧ -b^{1, 434}_1 ∧ -b^{1, 434}_0 ∧ true) 
c  in CNF:
c    -b^{1, 434}_2 ∨  b^{1, 434}_1 ∨  b^{1, 434}_0 ∨ false 
c  in DIMACS:
-2462  2463  2464  0

c  3 does not represent an automaton state.
c    -(-b^{1, 434}_2 ∧  b^{1, 434}_1 ∧  b^{1, 434}_0 ∧ true) 
c  in CNF:
c     b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ false 
c  in DIMACS:
 2462 -2463 -2464  0
c  -3 does not represent an automaton state.
c    -( b^{1, 434}_2 ∧  b^{1, 434}_1 ∧  b^{1, 434}_0 ∧ true) 
c  in CNF:
c    -b^{1, 434}_2 ∨ -b^{1, 434}_1 ∨ -b^{1, 434}_0 ∨ false 
c  in DIMACS:
-2462 -2463 -2464  0

c i = 435
c  -2+1 --> -1
c    ( b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧  p_435) -> ( b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0)
c  in CNF:
c    -b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨  b^{1, 436}_2
c    -b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_1
c    -b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨  b^{1, 436}_0
c  in DIMACS:
-2465 -2466  2467 -435  2468 0
-2465 -2466  2467 -435 -2469 0
-2465 -2466  2467 -435  2470 0

c  -1+1 --> 0
c    ( b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0 ∧  p_435) -> (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧ -b^{1, 436}_0)
c  in CNF:
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_2
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_1
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_0
c  in DIMACS:
-2465  2466 -2467 -435 -2468 0
-2465  2466 -2467 -435 -2469 0
-2465  2466 -2467 -435 -2470 0

c  0+1 --> 1
c    (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧  p_435) -> (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0)
c  in CNF:
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_2
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_1
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨  b^{1, 436}_0
c  in DIMACS:
 2465  2466  2467 -435 -2468 0
 2465  2466  2467 -435 -2469 0
 2465  2466  2467 -435  2470 0

c  1+1 --> 2
c    (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0 ∧  p_435) -> (-b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0)
c  in CNF:
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_2
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨  b^{1, 436}_1
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ -p_435 ∨ -b^{1, 436}_0
c  in DIMACS:
 2465  2466 -2467 -435 -2468 0
 2465  2466 -2467 -435  2469 0
 2465  2466 -2467 -435 -2470 0

c  2+1 --> break 
c    (-b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧  p_435) -> break
c  in CNF:
c     b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 2465 -2466  2467 -435 1162 0


c  2-1 --> 1
c    (-b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧ -p_435) -> (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0)
c  in CNF:
c     b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_2
c     b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_1
c     b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨  b^{1, 436}_0
c  in DIMACS:
 2465 -2466  2467  435 -2468 0
 2465 -2466  2467  435 -2469 0
 2465 -2466  2467  435  2470 0

c  1-1 --> 0
c    (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0 ∧ -p_435) -> (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧ -b^{1, 436}_0)
c  in CNF:
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_2
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_1
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_0
c  in DIMACS:
 2465  2466 -2467  435 -2468 0
 2465  2466 -2467  435 -2469 0
 2465  2466 -2467  435 -2470 0

c  0-1 --> -1
c    (-b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧ -p_435) -> ( b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0)
c  in CNF:
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨  b^{1, 436}_2
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_1
c     b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨  b^{1, 436}_0
c  in DIMACS:
 2465  2466  2467  435  2468 0
 2465  2466  2467  435 -2469 0
 2465  2466  2467  435  2470 0

c  -1-1 --> -2
c    ( b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧  b^{1, 435}_0 ∧ -p_435) -> ( b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0)
c  in CNF:
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨  b^{1, 436}_2
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨  b^{1, 436}_1
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨  p_435 ∨ -b^{1, 436}_0
c  in DIMACS:
-2465  2466 -2467  435  2468 0
-2465  2466 -2467  435  2469 0
-2465  2466 -2467  435 -2470 0

c  -2-1 --> break 
c    ( b^{1, 435}_2 ∧  b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨  b^{1, 435}_0 ∨  p_435 ∨ break
c  in DIMACS:
-2465 -2466  2467  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 435}_2 ∧ -b^{1, 435}_1 ∧ -b^{1, 435}_0 ∧ true) 
c  in CNF:
c    -b^{1, 435}_2 ∨  b^{1, 435}_1 ∨  b^{1, 435}_0 ∨ false 
c  in DIMACS:
-2465  2466  2467  0

c  3 does not represent an automaton state.
c    -(-b^{1, 435}_2 ∧  b^{1, 435}_1 ∧  b^{1, 435}_0 ∧ true) 
c  in CNF:
c     b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ false 
c  in DIMACS:
 2465 -2466 -2467  0
c  -3 does not represent an automaton state.
c    -( b^{1, 435}_2 ∧  b^{1, 435}_1 ∧  b^{1, 435}_0 ∧ true) 
c  in CNF:
c    -b^{1, 435}_2 ∨ -b^{1, 435}_1 ∨ -b^{1, 435}_0 ∨ false 
c  in DIMACS:
-2465 -2466 -2467  0

c i = 436
c  -2+1 --> -1
c    ( b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧  p_436) -> ( b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0)
c  in CNF:
c    -b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨  b^{1, 437}_2
c    -b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_1
c    -b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨  b^{1, 437}_0
c  in DIMACS:
-2468 -2469  2470 -436  2471 0
-2468 -2469  2470 -436 -2472 0
-2468 -2469  2470 -436  2473 0

c  -1+1 --> 0
c    ( b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0 ∧  p_436) -> (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧ -b^{1, 437}_0)
c  in CNF:
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_2
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_1
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_0
c  in DIMACS:
-2468  2469 -2470 -436 -2471 0
-2468  2469 -2470 -436 -2472 0
-2468  2469 -2470 -436 -2473 0

c  0+1 --> 1
c    (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧  p_436) -> (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0)
c  in CNF:
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_2
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_1
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨  b^{1, 437}_0
c  in DIMACS:
 2468  2469  2470 -436 -2471 0
 2468  2469  2470 -436 -2472 0
 2468  2469  2470 -436  2473 0

c  1+1 --> 2
c    (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0 ∧  p_436) -> (-b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0)
c  in CNF:
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_2
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨  b^{1, 437}_1
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ -p_436 ∨ -b^{1, 437}_0
c  in DIMACS:
 2468  2469 -2470 -436 -2471 0
 2468  2469 -2470 -436  2472 0
 2468  2469 -2470 -436 -2473 0

c  2+1 --> break 
c    (-b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧  p_436) -> break
c  in CNF:
c     b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ -p_436 ∨ break
c  in DIMACS:
 2468 -2469  2470 -436 1162 0


c  2-1 --> 1
c    (-b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧ -p_436) -> (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0)
c  in CNF:
c     b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_2
c     b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_1
c     b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨  b^{1, 437}_0
c  in DIMACS:
 2468 -2469  2470  436 -2471 0
 2468 -2469  2470  436 -2472 0
 2468 -2469  2470  436  2473 0

c  1-1 --> 0
c    (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0 ∧ -p_436) -> (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧ -b^{1, 437}_0)
c  in CNF:
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_2
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_1
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_0
c  in DIMACS:
 2468  2469 -2470  436 -2471 0
 2468  2469 -2470  436 -2472 0
 2468  2469 -2470  436 -2473 0

c  0-1 --> -1
c    (-b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧ -p_436) -> ( b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0)
c  in CNF:
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨  b^{1, 437}_2
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_1
c     b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨  b^{1, 437}_0
c  in DIMACS:
 2468  2469  2470  436  2471 0
 2468  2469  2470  436 -2472 0
 2468  2469  2470  436  2473 0

c  -1-1 --> -2
c    ( b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧  b^{1, 436}_0 ∧ -p_436) -> ( b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0)
c  in CNF:
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨  b^{1, 437}_2
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨  b^{1, 437}_1
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨  p_436 ∨ -b^{1, 437}_0
c  in DIMACS:
-2468  2469 -2470  436  2471 0
-2468  2469 -2470  436  2472 0
-2468  2469 -2470  436 -2473 0

c  -2-1 --> break 
c    ( b^{1, 436}_2 ∧  b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧ -p_436) -> break
c  in CNF:
c    -b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨  b^{1, 436}_0 ∨  p_436 ∨ break
c  in DIMACS:
-2468 -2469  2470  436 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 436}_2 ∧ -b^{1, 436}_1 ∧ -b^{1, 436}_0 ∧ true) 
c  in CNF:
c    -b^{1, 436}_2 ∨  b^{1, 436}_1 ∨  b^{1, 436}_0 ∨ false 
c  in DIMACS:
-2468  2469  2470  0

c  3 does not represent an automaton state.
c    -(-b^{1, 436}_2 ∧  b^{1, 436}_1 ∧  b^{1, 436}_0 ∧ true) 
c  in CNF:
c     b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ false 
c  in DIMACS:
 2468 -2469 -2470  0
c  -3 does not represent an automaton state.
c    -( b^{1, 436}_2 ∧  b^{1, 436}_1 ∧  b^{1, 436}_0 ∧ true) 
c  in CNF:
c    -b^{1, 436}_2 ∨ -b^{1, 436}_1 ∨ -b^{1, 436}_0 ∨ false 
c  in DIMACS:
-2468 -2469 -2470  0

c i = 437
c  -2+1 --> -1
c    ( b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧  p_437) -> ( b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0)
c  in CNF:
c    -b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨  b^{1, 438}_2
c    -b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_1
c    -b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨  b^{1, 438}_0
c  in DIMACS:
-2471 -2472  2473 -437  2474 0
-2471 -2472  2473 -437 -2475 0
-2471 -2472  2473 -437  2476 0

c  -1+1 --> 0
c    ( b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0 ∧  p_437) -> (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧ -b^{1, 438}_0)
c  in CNF:
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_2
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_1
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_0
c  in DIMACS:
-2471  2472 -2473 -437 -2474 0
-2471  2472 -2473 -437 -2475 0
-2471  2472 -2473 -437 -2476 0

c  0+1 --> 1
c    (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧  p_437) -> (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0)
c  in CNF:
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_2
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_1
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨  b^{1, 438}_0
c  in DIMACS:
 2471  2472  2473 -437 -2474 0
 2471  2472  2473 -437 -2475 0
 2471  2472  2473 -437  2476 0

c  1+1 --> 2
c    (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0 ∧  p_437) -> (-b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0)
c  in CNF:
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_2
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨  b^{1, 438}_1
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ -p_437 ∨ -b^{1, 438}_0
c  in DIMACS:
 2471  2472 -2473 -437 -2474 0
 2471  2472 -2473 -437  2475 0
 2471  2472 -2473 -437 -2476 0

c  2+1 --> break 
c    (-b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧  p_437) -> break
c  in CNF:
c     b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ -p_437 ∨ break
c  in DIMACS:
 2471 -2472  2473 -437 1162 0


c  2-1 --> 1
c    (-b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧ -p_437) -> (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0)
c  in CNF:
c     b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_2
c     b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_1
c     b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨  b^{1, 438}_0
c  in DIMACS:
 2471 -2472  2473  437 -2474 0
 2471 -2472  2473  437 -2475 0
 2471 -2472  2473  437  2476 0

c  1-1 --> 0
c    (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0 ∧ -p_437) -> (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧ -b^{1, 438}_0)
c  in CNF:
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_2
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_1
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_0
c  in DIMACS:
 2471  2472 -2473  437 -2474 0
 2471  2472 -2473  437 -2475 0
 2471  2472 -2473  437 -2476 0

c  0-1 --> -1
c    (-b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧ -p_437) -> ( b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0)
c  in CNF:
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨  b^{1, 438}_2
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_1
c     b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨  b^{1, 438}_0
c  in DIMACS:
 2471  2472  2473  437  2474 0
 2471  2472  2473  437 -2475 0
 2471  2472  2473  437  2476 0

c  -1-1 --> -2
c    ( b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧  b^{1, 437}_0 ∧ -p_437) -> ( b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0)
c  in CNF:
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨  b^{1, 438}_2
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨  b^{1, 438}_1
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨  p_437 ∨ -b^{1, 438}_0
c  in DIMACS:
-2471  2472 -2473  437  2474 0
-2471  2472 -2473  437  2475 0
-2471  2472 -2473  437 -2476 0

c  -2-1 --> break 
c    ( b^{1, 437}_2 ∧  b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧ -p_437) -> break
c  in CNF:
c    -b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨  b^{1, 437}_0 ∨  p_437 ∨ break
c  in DIMACS:
-2471 -2472  2473  437 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 437}_2 ∧ -b^{1, 437}_1 ∧ -b^{1, 437}_0 ∧ true) 
c  in CNF:
c    -b^{1, 437}_2 ∨  b^{1, 437}_1 ∨  b^{1, 437}_0 ∨ false 
c  in DIMACS:
-2471  2472  2473  0

c  3 does not represent an automaton state.
c    -(-b^{1, 437}_2 ∧  b^{1, 437}_1 ∧  b^{1, 437}_0 ∧ true) 
c  in CNF:
c     b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ false 
c  in DIMACS:
 2471 -2472 -2473  0
c  -3 does not represent an automaton state.
c    -( b^{1, 437}_2 ∧  b^{1, 437}_1 ∧  b^{1, 437}_0 ∧ true) 
c  in CNF:
c    -b^{1, 437}_2 ∨ -b^{1, 437}_1 ∨ -b^{1, 437}_0 ∨ false 
c  in DIMACS:
-2471 -2472 -2473  0

c i = 438
c  -2+1 --> -1
c    ( b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧  p_438) -> ( b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0)
c  in CNF:
c    -b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨  b^{1, 439}_2
c    -b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_1
c    -b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨  b^{1, 439}_0
c  in DIMACS:
-2474 -2475  2476 -438  2477 0
-2474 -2475  2476 -438 -2478 0
-2474 -2475  2476 -438  2479 0

c  -1+1 --> 0
c    ( b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0 ∧  p_438) -> (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧ -b^{1, 439}_0)
c  in CNF:
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_2
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_1
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_0
c  in DIMACS:
-2474  2475 -2476 -438 -2477 0
-2474  2475 -2476 -438 -2478 0
-2474  2475 -2476 -438 -2479 0

c  0+1 --> 1
c    (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧  p_438) -> (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0)
c  in CNF:
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_2
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_1
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨  b^{1, 439}_0
c  in DIMACS:
 2474  2475  2476 -438 -2477 0
 2474  2475  2476 -438 -2478 0
 2474  2475  2476 -438  2479 0

c  1+1 --> 2
c    (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0 ∧  p_438) -> (-b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0)
c  in CNF:
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_2
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨  b^{1, 439}_1
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ -p_438 ∨ -b^{1, 439}_0
c  in DIMACS:
 2474  2475 -2476 -438 -2477 0
 2474  2475 -2476 -438  2478 0
 2474  2475 -2476 -438 -2479 0

c  2+1 --> break 
c    (-b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧  p_438) -> break
c  in CNF:
c     b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 2474 -2475  2476 -438 1162 0


c  2-1 --> 1
c    (-b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧ -p_438) -> (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0)
c  in CNF:
c     b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_2
c     b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_1
c     b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨  b^{1, 439}_0
c  in DIMACS:
 2474 -2475  2476  438 -2477 0
 2474 -2475  2476  438 -2478 0
 2474 -2475  2476  438  2479 0

c  1-1 --> 0
c    (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0 ∧ -p_438) -> (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧ -b^{1, 439}_0)
c  in CNF:
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_2
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_1
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_0
c  in DIMACS:
 2474  2475 -2476  438 -2477 0
 2474  2475 -2476  438 -2478 0
 2474  2475 -2476  438 -2479 0

c  0-1 --> -1
c    (-b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧ -p_438) -> ( b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0)
c  in CNF:
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨  b^{1, 439}_2
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_1
c     b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨  b^{1, 439}_0
c  in DIMACS:
 2474  2475  2476  438  2477 0
 2474  2475  2476  438 -2478 0
 2474  2475  2476  438  2479 0

c  -1-1 --> -2
c    ( b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧  b^{1, 438}_0 ∧ -p_438) -> ( b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0)
c  in CNF:
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨  b^{1, 439}_2
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨  b^{1, 439}_1
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨  p_438 ∨ -b^{1, 439}_0
c  in DIMACS:
-2474  2475 -2476  438  2477 0
-2474  2475 -2476  438  2478 0
-2474  2475 -2476  438 -2479 0

c  -2-1 --> break 
c    ( b^{1, 438}_2 ∧  b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨  b^{1, 438}_0 ∨  p_438 ∨ break
c  in DIMACS:
-2474 -2475  2476  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 438}_2 ∧ -b^{1, 438}_1 ∧ -b^{1, 438}_0 ∧ true) 
c  in CNF:
c    -b^{1, 438}_2 ∨  b^{1, 438}_1 ∨  b^{1, 438}_0 ∨ false 
c  in DIMACS:
-2474  2475  2476  0

c  3 does not represent an automaton state.
c    -(-b^{1, 438}_2 ∧  b^{1, 438}_1 ∧  b^{1, 438}_0 ∧ true) 
c  in CNF:
c     b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ false 
c  in DIMACS:
 2474 -2475 -2476  0
c  -3 does not represent an automaton state.
c    -( b^{1, 438}_2 ∧  b^{1, 438}_1 ∧  b^{1, 438}_0 ∧ true) 
c  in CNF:
c    -b^{1, 438}_2 ∨ -b^{1, 438}_1 ∨ -b^{1, 438}_0 ∨ false 
c  in DIMACS:
-2474 -2475 -2476  0

c i = 439
c  -2+1 --> -1
c    ( b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧  p_439) -> ( b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0)
c  in CNF:
c    -b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨  b^{1, 440}_2
c    -b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_1
c    -b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨  b^{1, 440}_0
c  in DIMACS:
-2477 -2478  2479 -439  2480 0
-2477 -2478  2479 -439 -2481 0
-2477 -2478  2479 -439  2482 0

c  -1+1 --> 0
c    ( b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0 ∧  p_439) -> (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧ -b^{1, 440}_0)
c  in CNF:
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_2
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_1
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_0
c  in DIMACS:
-2477  2478 -2479 -439 -2480 0
-2477  2478 -2479 -439 -2481 0
-2477  2478 -2479 -439 -2482 0

c  0+1 --> 1
c    (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧  p_439) -> (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0)
c  in CNF:
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_2
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_1
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨  b^{1, 440}_0
c  in DIMACS:
 2477  2478  2479 -439 -2480 0
 2477  2478  2479 -439 -2481 0
 2477  2478  2479 -439  2482 0

c  1+1 --> 2
c    (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0 ∧  p_439) -> (-b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0)
c  in CNF:
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_2
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨  b^{1, 440}_1
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ -p_439 ∨ -b^{1, 440}_0
c  in DIMACS:
 2477  2478 -2479 -439 -2480 0
 2477  2478 -2479 -439  2481 0
 2477  2478 -2479 -439 -2482 0

c  2+1 --> break 
c    (-b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧  p_439) -> break
c  in CNF:
c     b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ -p_439 ∨ break
c  in DIMACS:
 2477 -2478  2479 -439 1162 0


c  2-1 --> 1
c    (-b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧ -p_439) -> (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0)
c  in CNF:
c     b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_2
c     b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_1
c     b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨  b^{1, 440}_0
c  in DIMACS:
 2477 -2478  2479  439 -2480 0
 2477 -2478  2479  439 -2481 0
 2477 -2478  2479  439  2482 0

c  1-1 --> 0
c    (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0 ∧ -p_439) -> (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧ -b^{1, 440}_0)
c  in CNF:
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_2
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_1
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_0
c  in DIMACS:
 2477  2478 -2479  439 -2480 0
 2477  2478 -2479  439 -2481 0
 2477  2478 -2479  439 -2482 0

c  0-1 --> -1
c    (-b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧ -p_439) -> ( b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0)
c  in CNF:
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨  b^{1, 440}_2
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_1
c     b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨  b^{1, 440}_0
c  in DIMACS:
 2477  2478  2479  439  2480 0
 2477  2478  2479  439 -2481 0
 2477  2478  2479  439  2482 0

c  -1-1 --> -2
c    ( b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧  b^{1, 439}_0 ∧ -p_439) -> ( b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0)
c  in CNF:
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨  b^{1, 440}_2
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨  b^{1, 440}_1
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨  p_439 ∨ -b^{1, 440}_0
c  in DIMACS:
-2477  2478 -2479  439  2480 0
-2477  2478 -2479  439  2481 0
-2477  2478 -2479  439 -2482 0

c  -2-1 --> break 
c    ( b^{1, 439}_2 ∧  b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧ -p_439) -> break
c  in CNF:
c    -b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨  b^{1, 439}_0 ∨  p_439 ∨ break
c  in DIMACS:
-2477 -2478  2479  439 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 439}_2 ∧ -b^{1, 439}_1 ∧ -b^{1, 439}_0 ∧ true) 
c  in CNF:
c    -b^{1, 439}_2 ∨  b^{1, 439}_1 ∨  b^{1, 439}_0 ∨ false 
c  in DIMACS:
-2477  2478  2479  0

c  3 does not represent an automaton state.
c    -(-b^{1, 439}_2 ∧  b^{1, 439}_1 ∧  b^{1, 439}_0 ∧ true) 
c  in CNF:
c     b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ false 
c  in DIMACS:
 2477 -2478 -2479  0
c  -3 does not represent an automaton state.
c    -( b^{1, 439}_2 ∧  b^{1, 439}_1 ∧  b^{1, 439}_0 ∧ true) 
c  in CNF:
c    -b^{1, 439}_2 ∨ -b^{1, 439}_1 ∨ -b^{1, 439}_0 ∨ false 
c  in DIMACS:
-2477 -2478 -2479  0

c i = 440
c  -2+1 --> -1
c    ( b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧  p_440) -> ( b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0)
c  in CNF:
c    -b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨  b^{1, 441}_2
c    -b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_1
c    -b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨  b^{1, 441}_0
c  in DIMACS:
-2480 -2481  2482 -440  2483 0
-2480 -2481  2482 -440 -2484 0
-2480 -2481  2482 -440  2485 0

c  -1+1 --> 0
c    ( b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0 ∧  p_440) -> (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧ -b^{1, 441}_0)
c  in CNF:
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_2
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_1
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_0
c  in DIMACS:
-2480  2481 -2482 -440 -2483 0
-2480  2481 -2482 -440 -2484 0
-2480  2481 -2482 -440 -2485 0

c  0+1 --> 1
c    (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧  p_440) -> (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0)
c  in CNF:
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_2
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_1
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨  b^{1, 441}_0
c  in DIMACS:
 2480  2481  2482 -440 -2483 0
 2480  2481  2482 -440 -2484 0
 2480  2481  2482 -440  2485 0

c  1+1 --> 2
c    (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0 ∧  p_440) -> (-b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0)
c  in CNF:
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_2
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨  b^{1, 441}_1
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ -p_440 ∨ -b^{1, 441}_0
c  in DIMACS:
 2480  2481 -2482 -440 -2483 0
 2480  2481 -2482 -440  2484 0
 2480  2481 -2482 -440 -2485 0

c  2+1 --> break 
c    (-b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧  p_440) -> break
c  in CNF:
c     b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 2480 -2481  2482 -440 1162 0


c  2-1 --> 1
c    (-b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧ -p_440) -> (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0)
c  in CNF:
c     b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_2
c     b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_1
c     b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨  b^{1, 441}_0
c  in DIMACS:
 2480 -2481  2482  440 -2483 0
 2480 -2481  2482  440 -2484 0
 2480 -2481  2482  440  2485 0

c  1-1 --> 0
c    (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0 ∧ -p_440) -> (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧ -b^{1, 441}_0)
c  in CNF:
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_2
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_1
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_0
c  in DIMACS:
 2480  2481 -2482  440 -2483 0
 2480  2481 -2482  440 -2484 0
 2480  2481 -2482  440 -2485 0

c  0-1 --> -1
c    (-b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧ -p_440) -> ( b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0)
c  in CNF:
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨  b^{1, 441}_2
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_1
c     b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨  b^{1, 441}_0
c  in DIMACS:
 2480  2481  2482  440  2483 0
 2480  2481  2482  440 -2484 0
 2480  2481  2482  440  2485 0

c  -1-1 --> -2
c    ( b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧  b^{1, 440}_0 ∧ -p_440) -> ( b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0)
c  in CNF:
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨  b^{1, 441}_2
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨  b^{1, 441}_1
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨  p_440 ∨ -b^{1, 441}_0
c  in DIMACS:
-2480  2481 -2482  440  2483 0
-2480  2481 -2482  440  2484 0
-2480  2481 -2482  440 -2485 0

c  -2-1 --> break 
c    ( b^{1, 440}_2 ∧  b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨  b^{1, 440}_0 ∨  p_440 ∨ break
c  in DIMACS:
-2480 -2481  2482  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 440}_2 ∧ -b^{1, 440}_1 ∧ -b^{1, 440}_0 ∧ true) 
c  in CNF:
c    -b^{1, 440}_2 ∨  b^{1, 440}_1 ∨  b^{1, 440}_0 ∨ false 
c  in DIMACS:
-2480  2481  2482  0

c  3 does not represent an automaton state.
c    -(-b^{1, 440}_2 ∧  b^{1, 440}_1 ∧  b^{1, 440}_0 ∧ true) 
c  in CNF:
c     b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ false 
c  in DIMACS:
 2480 -2481 -2482  0
c  -3 does not represent an automaton state.
c    -( b^{1, 440}_2 ∧  b^{1, 440}_1 ∧  b^{1, 440}_0 ∧ true) 
c  in CNF:
c    -b^{1, 440}_2 ∨ -b^{1, 440}_1 ∨ -b^{1, 440}_0 ∨ false 
c  in DIMACS:
-2480 -2481 -2482  0

c i = 441
c  -2+1 --> -1
c    ( b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧  p_441) -> ( b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0)
c  in CNF:
c    -b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨  b^{1, 442}_2
c    -b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_1
c    -b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨  b^{1, 442}_0
c  in DIMACS:
-2483 -2484  2485 -441  2486 0
-2483 -2484  2485 -441 -2487 0
-2483 -2484  2485 -441  2488 0

c  -1+1 --> 0
c    ( b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0 ∧  p_441) -> (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧ -b^{1, 442}_0)
c  in CNF:
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_2
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_1
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_0
c  in DIMACS:
-2483  2484 -2485 -441 -2486 0
-2483  2484 -2485 -441 -2487 0
-2483  2484 -2485 -441 -2488 0

c  0+1 --> 1
c    (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧  p_441) -> (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0)
c  in CNF:
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_2
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_1
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨  b^{1, 442}_0
c  in DIMACS:
 2483  2484  2485 -441 -2486 0
 2483  2484  2485 -441 -2487 0
 2483  2484  2485 -441  2488 0

c  1+1 --> 2
c    (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0 ∧  p_441) -> (-b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0)
c  in CNF:
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_2
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨  b^{1, 442}_1
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ -p_441 ∨ -b^{1, 442}_0
c  in DIMACS:
 2483  2484 -2485 -441 -2486 0
 2483  2484 -2485 -441  2487 0
 2483  2484 -2485 -441 -2488 0

c  2+1 --> break 
c    (-b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧  p_441) -> break
c  in CNF:
c     b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 2483 -2484  2485 -441 1162 0


c  2-1 --> 1
c    (-b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧ -p_441) -> (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0)
c  in CNF:
c     b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_2
c     b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_1
c     b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨  b^{1, 442}_0
c  in DIMACS:
 2483 -2484  2485  441 -2486 0
 2483 -2484  2485  441 -2487 0
 2483 -2484  2485  441  2488 0

c  1-1 --> 0
c    (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0 ∧ -p_441) -> (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧ -b^{1, 442}_0)
c  in CNF:
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_2
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_1
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_0
c  in DIMACS:
 2483  2484 -2485  441 -2486 0
 2483  2484 -2485  441 -2487 0
 2483  2484 -2485  441 -2488 0

c  0-1 --> -1
c    (-b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧ -p_441) -> ( b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0)
c  in CNF:
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨  b^{1, 442}_2
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_1
c     b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨  b^{1, 442}_0
c  in DIMACS:
 2483  2484  2485  441  2486 0
 2483  2484  2485  441 -2487 0
 2483  2484  2485  441  2488 0

c  -1-1 --> -2
c    ( b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧  b^{1, 441}_0 ∧ -p_441) -> ( b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0)
c  in CNF:
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨  b^{1, 442}_2
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨  b^{1, 442}_1
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨  p_441 ∨ -b^{1, 442}_0
c  in DIMACS:
-2483  2484 -2485  441  2486 0
-2483  2484 -2485  441  2487 0
-2483  2484 -2485  441 -2488 0

c  -2-1 --> break 
c    ( b^{1, 441}_2 ∧  b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨  b^{1, 441}_0 ∨  p_441 ∨ break
c  in DIMACS:
-2483 -2484  2485  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 441}_2 ∧ -b^{1, 441}_1 ∧ -b^{1, 441}_0 ∧ true) 
c  in CNF:
c    -b^{1, 441}_2 ∨  b^{1, 441}_1 ∨  b^{1, 441}_0 ∨ false 
c  in DIMACS:
-2483  2484  2485  0

c  3 does not represent an automaton state.
c    -(-b^{1, 441}_2 ∧  b^{1, 441}_1 ∧  b^{1, 441}_0 ∧ true) 
c  in CNF:
c     b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ false 
c  in DIMACS:
 2483 -2484 -2485  0
c  -3 does not represent an automaton state.
c    -( b^{1, 441}_2 ∧  b^{1, 441}_1 ∧  b^{1, 441}_0 ∧ true) 
c  in CNF:
c    -b^{1, 441}_2 ∨ -b^{1, 441}_1 ∨ -b^{1, 441}_0 ∨ false 
c  in DIMACS:
-2483 -2484 -2485  0

c i = 442
c  -2+1 --> -1
c    ( b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧  p_442) -> ( b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0)
c  in CNF:
c    -b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨  b^{1, 443}_2
c    -b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_1
c    -b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨  b^{1, 443}_0
c  in DIMACS:
-2486 -2487  2488 -442  2489 0
-2486 -2487  2488 -442 -2490 0
-2486 -2487  2488 -442  2491 0

c  -1+1 --> 0
c    ( b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0 ∧  p_442) -> (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧ -b^{1, 443}_0)
c  in CNF:
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_2
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_1
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_0
c  in DIMACS:
-2486  2487 -2488 -442 -2489 0
-2486  2487 -2488 -442 -2490 0
-2486  2487 -2488 -442 -2491 0

c  0+1 --> 1
c    (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧  p_442) -> (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0)
c  in CNF:
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_2
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_1
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨  b^{1, 443}_0
c  in DIMACS:
 2486  2487  2488 -442 -2489 0
 2486  2487  2488 -442 -2490 0
 2486  2487  2488 -442  2491 0

c  1+1 --> 2
c    (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0 ∧  p_442) -> (-b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0)
c  in CNF:
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_2
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨  b^{1, 443}_1
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ -p_442 ∨ -b^{1, 443}_0
c  in DIMACS:
 2486  2487 -2488 -442 -2489 0
 2486  2487 -2488 -442  2490 0
 2486  2487 -2488 -442 -2491 0

c  2+1 --> break 
c    (-b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧  p_442) -> break
c  in CNF:
c     b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 2486 -2487  2488 -442 1162 0


c  2-1 --> 1
c    (-b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧ -p_442) -> (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0)
c  in CNF:
c     b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_2
c     b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_1
c     b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨  b^{1, 443}_0
c  in DIMACS:
 2486 -2487  2488  442 -2489 0
 2486 -2487  2488  442 -2490 0
 2486 -2487  2488  442  2491 0

c  1-1 --> 0
c    (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0 ∧ -p_442) -> (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧ -b^{1, 443}_0)
c  in CNF:
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_2
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_1
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_0
c  in DIMACS:
 2486  2487 -2488  442 -2489 0
 2486  2487 -2488  442 -2490 0
 2486  2487 -2488  442 -2491 0

c  0-1 --> -1
c    (-b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧ -p_442) -> ( b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0)
c  in CNF:
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨  b^{1, 443}_2
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_1
c     b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨  b^{1, 443}_0
c  in DIMACS:
 2486  2487  2488  442  2489 0
 2486  2487  2488  442 -2490 0
 2486  2487  2488  442  2491 0

c  -1-1 --> -2
c    ( b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧  b^{1, 442}_0 ∧ -p_442) -> ( b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0)
c  in CNF:
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨  b^{1, 443}_2
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨  b^{1, 443}_1
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨  p_442 ∨ -b^{1, 443}_0
c  in DIMACS:
-2486  2487 -2488  442  2489 0
-2486  2487 -2488  442  2490 0
-2486  2487 -2488  442 -2491 0

c  -2-1 --> break 
c    ( b^{1, 442}_2 ∧  b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨  b^{1, 442}_0 ∨  p_442 ∨ break
c  in DIMACS:
-2486 -2487  2488  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 442}_2 ∧ -b^{1, 442}_1 ∧ -b^{1, 442}_0 ∧ true) 
c  in CNF:
c    -b^{1, 442}_2 ∨  b^{1, 442}_1 ∨  b^{1, 442}_0 ∨ false 
c  in DIMACS:
-2486  2487  2488  0

c  3 does not represent an automaton state.
c    -(-b^{1, 442}_2 ∧  b^{1, 442}_1 ∧  b^{1, 442}_0 ∧ true) 
c  in CNF:
c     b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ false 
c  in DIMACS:
 2486 -2487 -2488  0
c  -3 does not represent an automaton state.
c    -( b^{1, 442}_2 ∧  b^{1, 442}_1 ∧  b^{1, 442}_0 ∧ true) 
c  in CNF:
c    -b^{1, 442}_2 ∨ -b^{1, 442}_1 ∨ -b^{1, 442}_0 ∨ false 
c  in DIMACS:
-2486 -2487 -2488  0

c i = 443
c  -2+1 --> -1
c    ( b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧  p_443) -> ( b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0)
c  in CNF:
c    -b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨  b^{1, 444}_2
c    -b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_1
c    -b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨  b^{1, 444}_0
c  in DIMACS:
-2489 -2490  2491 -443  2492 0
-2489 -2490  2491 -443 -2493 0
-2489 -2490  2491 -443  2494 0

c  -1+1 --> 0
c    ( b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0 ∧  p_443) -> (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧ -b^{1, 444}_0)
c  in CNF:
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_2
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_1
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_0
c  in DIMACS:
-2489  2490 -2491 -443 -2492 0
-2489  2490 -2491 -443 -2493 0
-2489  2490 -2491 -443 -2494 0

c  0+1 --> 1
c    (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧  p_443) -> (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0)
c  in CNF:
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_2
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_1
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨  b^{1, 444}_0
c  in DIMACS:
 2489  2490  2491 -443 -2492 0
 2489  2490  2491 -443 -2493 0
 2489  2490  2491 -443  2494 0

c  1+1 --> 2
c    (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0 ∧  p_443) -> (-b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0)
c  in CNF:
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_2
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨  b^{1, 444}_1
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ -p_443 ∨ -b^{1, 444}_0
c  in DIMACS:
 2489  2490 -2491 -443 -2492 0
 2489  2490 -2491 -443  2493 0
 2489  2490 -2491 -443 -2494 0

c  2+1 --> break 
c    (-b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧  p_443) -> break
c  in CNF:
c     b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ -p_443 ∨ break
c  in DIMACS:
 2489 -2490  2491 -443 1162 0


c  2-1 --> 1
c    (-b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧ -p_443) -> (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0)
c  in CNF:
c     b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_2
c     b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_1
c     b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨  b^{1, 444}_0
c  in DIMACS:
 2489 -2490  2491  443 -2492 0
 2489 -2490  2491  443 -2493 0
 2489 -2490  2491  443  2494 0

c  1-1 --> 0
c    (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0 ∧ -p_443) -> (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧ -b^{1, 444}_0)
c  in CNF:
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_2
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_1
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_0
c  in DIMACS:
 2489  2490 -2491  443 -2492 0
 2489  2490 -2491  443 -2493 0
 2489  2490 -2491  443 -2494 0

c  0-1 --> -1
c    (-b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧ -p_443) -> ( b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0)
c  in CNF:
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨  b^{1, 444}_2
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_1
c     b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨  b^{1, 444}_0
c  in DIMACS:
 2489  2490  2491  443  2492 0
 2489  2490  2491  443 -2493 0
 2489  2490  2491  443  2494 0

c  -1-1 --> -2
c    ( b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧  b^{1, 443}_0 ∧ -p_443) -> ( b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0)
c  in CNF:
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨  b^{1, 444}_2
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨  b^{1, 444}_1
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨  p_443 ∨ -b^{1, 444}_0
c  in DIMACS:
-2489  2490 -2491  443  2492 0
-2489  2490 -2491  443  2493 0
-2489  2490 -2491  443 -2494 0

c  -2-1 --> break 
c    ( b^{1, 443}_2 ∧  b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧ -p_443) -> break
c  in CNF:
c    -b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨  b^{1, 443}_0 ∨  p_443 ∨ break
c  in DIMACS:
-2489 -2490  2491  443 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 443}_2 ∧ -b^{1, 443}_1 ∧ -b^{1, 443}_0 ∧ true) 
c  in CNF:
c    -b^{1, 443}_2 ∨  b^{1, 443}_1 ∨  b^{1, 443}_0 ∨ false 
c  in DIMACS:
-2489  2490  2491  0

c  3 does not represent an automaton state.
c    -(-b^{1, 443}_2 ∧  b^{1, 443}_1 ∧  b^{1, 443}_0 ∧ true) 
c  in CNF:
c     b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ false 
c  in DIMACS:
 2489 -2490 -2491  0
c  -3 does not represent an automaton state.
c    -( b^{1, 443}_2 ∧  b^{1, 443}_1 ∧  b^{1, 443}_0 ∧ true) 
c  in CNF:
c    -b^{1, 443}_2 ∨ -b^{1, 443}_1 ∨ -b^{1, 443}_0 ∨ false 
c  in DIMACS:
-2489 -2490 -2491  0

c i = 444
c  -2+1 --> -1
c    ( b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧  p_444) -> ( b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0)
c  in CNF:
c    -b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨  b^{1, 445}_2
c    -b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_1
c    -b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨  b^{1, 445}_0
c  in DIMACS:
-2492 -2493  2494 -444  2495 0
-2492 -2493  2494 -444 -2496 0
-2492 -2493  2494 -444  2497 0

c  -1+1 --> 0
c    ( b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0 ∧  p_444) -> (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧ -b^{1, 445}_0)
c  in CNF:
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_2
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_1
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_0
c  in DIMACS:
-2492  2493 -2494 -444 -2495 0
-2492  2493 -2494 -444 -2496 0
-2492  2493 -2494 -444 -2497 0

c  0+1 --> 1
c    (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧  p_444) -> (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0)
c  in CNF:
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_2
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_1
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨  b^{1, 445}_0
c  in DIMACS:
 2492  2493  2494 -444 -2495 0
 2492  2493  2494 -444 -2496 0
 2492  2493  2494 -444  2497 0

c  1+1 --> 2
c    (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0 ∧  p_444) -> (-b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0)
c  in CNF:
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_2
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨  b^{1, 445}_1
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ -p_444 ∨ -b^{1, 445}_0
c  in DIMACS:
 2492  2493 -2494 -444 -2495 0
 2492  2493 -2494 -444  2496 0
 2492  2493 -2494 -444 -2497 0

c  2+1 --> break 
c    (-b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧  p_444) -> break
c  in CNF:
c     b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 2492 -2493  2494 -444 1162 0


c  2-1 --> 1
c    (-b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧ -p_444) -> (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0)
c  in CNF:
c     b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_2
c     b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_1
c     b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨  b^{1, 445}_0
c  in DIMACS:
 2492 -2493  2494  444 -2495 0
 2492 -2493  2494  444 -2496 0
 2492 -2493  2494  444  2497 0

c  1-1 --> 0
c    (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0 ∧ -p_444) -> (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧ -b^{1, 445}_0)
c  in CNF:
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_2
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_1
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_0
c  in DIMACS:
 2492  2493 -2494  444 -2495 0
 2492  2493 -2494  444 -2496 0
 2492  2493 -2494  444 -2497 0

c  0-1 --> -1
c    (-b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧ -p_444) -> ( b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0)
c  in CNF:
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨  b^{1, 445}_2
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_1
c     b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨  b^{1, 445}_0
c  in DIMACS:
 2492  2493  2494  444  2495 0
 2492  2493  2494  444 -2496 0
 2492  2493  2494  444  2497 0

c  -1-1 --> -2
c    ( b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧  b^{1, 444}_0 ∧ -p_444) -> ( b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0)
c  in CNF:
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨  b^{1, 445}_2
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨  b^{1, 445}_1
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨  p_444 ∨ -b^{1, 445}_0
c  in DIMACS:
-2492  2493 -2494  444  2495 0
-2492  2493 -2494  444  2496 0
-2492  2493 -2494  444 -2497 0

c  -2-1 --> break 
c    ( b^{1, 444}_2 ∧  b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨  b^{1, 444}_0 ∨  p_444 ∨ break
c  in DIMACS:
-2492 -2493  2494  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 444}_2 ∧ -b^{1, 444}_1 ∧ -b^{1, 444}_0 ∧ true) 
c  in CNF:
c    -b^{1, 444}_2 ∨  b^{1, 444}_1 ∨  b^{1, 444}_0 ∨ false 
c  in DIMACS:
-2492  2493  2494  0

c  3 does not represent an automaton state.
c    -(-b^{1, 444}_2 ∧  b^{1, 444}_1 ∧  b^{1, 444}_0 ∧ true) 
c  in CNF:
c     b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ false 
c  in DIMACS:
 2492 -2493 -2494  0
c  -3 does not represent an automaton state.
c    -( b^{1, 444}_2 ∧  b^{1, 444}_1 ∧  b^{1, 444}_0 ∧ true) 
c  in CNF:
c    -b^{1, 444}_2 ∨ -b^{1, 444}_1 ∨ -b^{1, 444}_0 ∨ false 
c  in DIMACS:
-2492 -2493 -2494  0

c i = 445
c  -2+1 --> -1
c    ( b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧  p_445) -> ( b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0)
c  in CNF:
c    -b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨  b^{1, 446}_2
c    -b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_1
c    -b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨  b^{1, 446}_0
c  in DIMACS:
-2495 -2496  2497 -445  2498 0
-2495 -2496  2497 -445 -2499 0
-2495 -2496  2497 -445  2500 0

c  -1+1 --> 0
c    ( b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0 ∧  p_445) -> (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧ -b^{1, 446}_0)
c  in CNF:
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_2
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_1
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_0
c  in DIMACS:
-2495  2496 -2497 -445 -2498 0
-2495  2496 -2497 -445 -2499 0
-2495  2496 -2497 -445 -2500 0

c  0+1 --> 1
c    (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧  p_445) -> (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0)
c  in CNF:
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_2
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_1
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨  b^{1, 446}_0
c  in DIMACS:
 2495  2496  2497 -445 -2498 0
 2495  2496  2497 -445 -2499 0
 2495  2496  2497 -445  2500 0

c  1+1 --> 2
c    (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0 ∧  p_445) -> (-b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0)
c  in CNF:
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_2
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨  b^{1, 446}_1
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ -p_445 ∨ -b^{1, 446}_0
c  in DIMACS:
 2495  2496 -2497 -445 -2498 0
 2495  2496 -2497 -445  2499 0
 2495  2496 -2497 -445 -2500 0

c  2+1 --> break 
c    (-b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧  p_445) -> break
c  in CNF:
c     b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ -p_445 ∨ break
c  in DIMACS:
 2495 -2496  2497 -445 1162 0


c  2-1 --> 1
c    (-b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧ -p_445) -> (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0)
c  in CNF:
c     b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_2
c     b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_1
c     b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨  b^{1, 446}_0
c  in DIMACS:
 2495 -2496  2497  445 -2498 0
 2495 -2496  2497  445 -2499 0
 2495 -2496  2497  445  2500 0

c  1-1 --> 0
c    (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0 ∧ -p_445) -> (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧ -b^{1, 446}_0)
c  in CNF:
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_2
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_1
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_0
c  in DIMACS:
 2495  2496 -2497  445 -2498 0
 2495  2496 -2497  445 -2499 0
 2495  2496 -2497  445 -2500 0

c  0-1 --> -1
c    (-b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧ -p_445) -> ( b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0)
c  in CNF:
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨  b^{1, 446}_2
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_1
c     b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨  b^{1, 446}_0
c  in DIMACS:
 2495  2496  2497  445  2498 0
 2495  2496  2497  445 -2499 0
 2495  2496  2497  445  2500 0

c  -1-1 --> -2
c    ( b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧  b^{1, 445}_0 ∧ -p_445) -> ( b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0)
c  in CNF:
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨  b^{1, 446}_2
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨  b^{1, 446}_1
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨  p_445 ∨ -b^{1, 446}_0
c  in DIMACS:
-2495  2496 -2497  445  2498 0
-2495  2496 -2497  445  2499 0
-2495  2496 -2497  445 -2500 0

c  -2-1 --> break 
c    ( b^{1, 445}_2 ∧  b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧ -p_445) -> break
c  in CNF:
c    -b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨  b^{1, 445}_0 ∨  p_445 ∨ break
c  in DIMACS:
-2495 -2496  2497  445 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 445}_2 ∧ -b^{1, 445}_1 ∧ -b^{1, 445}_0 ∧ true) 
c  in CNF:
c    -b^{1, 445}_2 ∨  b^{1, 445}_1 ∨  b^{1, 445}_0 ∨ false 
c  in DIMACS:
-2495  2496  2497  0

c  3 does not represent an automaton state.
c    -(-b^{1, 445}_2 ∧  b^{1, 445}_1 ∧  b^{1, 445}_0 ∧ true) 
c  in CNF:
c     b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ false 
c  in DIMACS:
 2495 -2496 -2497  0
c  -3 does not represent an automaton state.
c    -( b^{1, 445}_2 ∧  b^{1, 445}_1 ∧  b^{1, 445}_0 ∧ true) 
c  in CNF:
c    -b^{1, 445}_2 ∨ -b^{1, 445}_1 ∨ -b^{1, 445}_0 ∨ false 
c  in DIMACS:
-2495 -2496 -2497  0

c i = 446
c  -2+1 --> -1
c    ( b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧  p_446) -> ( b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0)
c  in CNF:
c    -b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨  b^{1, 447}_2
c    -b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_1
c    -b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨  b^{1, 447}_0
c  in DIMACS:
-2498 -2499  2500 -446  2501 0
-2498 -2499  2500 -446 -2502 0
-2498 -2499  2500 -446  2503 0

c  -1+1 --> 0
c    ( b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0 ∧  p_446) -> (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧ -b^{1, 447}_0)
c  in CNF:
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_2
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_1
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_0
c  in DIMACS:
-2498  2499 -2500 -446 -2501 0
-2498  2499 -2500 -446 -2502 0
-2498  2499 -2500 -446 -2503 0

c  0+1 --> 1
c    (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧  p_446) -> (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0)
c  in CNF:
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_2
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_1
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨  b^{1, 447}_0
c  in DIMACS:
 2498  2499  2500 -446 -2501 0
 2498  2499  2500 -446 -2502 0
 2498  2499  2500 -446  2503 0

c  1+1 --> 2
c    (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0 ∧  p_446) -> (-b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0)
c  in CNF:
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_2
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨  b^{1, 447}_1
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ -p_446 ∨ -b^{1, 447}_0
c  in DIMACS:
 2498  2499 -2500 -446 -2501 0
 2498  2499 -2500 -446  2502 0
 2498  2499 -2500 -446 -2503 0

c  2+1 --> break 
c    (-b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧  p_446) -> break
c  in CNF:
c     b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ -p_446 ∨ break
c  in DIMACS:
 2498 -2499  2500 -446 1162 0


c  2-1 --> 1
c    (-b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧ -p_446) -> (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0)
c  in CNF:
c     b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_2
c     b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_1
c     b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨  b^{1, 447}_0
c  in DIMACS:
 2498 -2499  2500  446 -2501 0
 2498 -2499  2500  446 -2502 0
 2498 -2499  2500  446  2503 0

c  1-1 --> 0
c    (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0 ∧ -p_446) -> (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧ -b^{1, 447}_0)
c  in CNF:
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_2
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_1
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_0
c  in DIMACS:
 2498  2499 -2500  446 -2501 0
 2498  2499 -2500  446 -2502 0
 2498  2499 -2500  446 -2503 0

c  0-1 --> -1
c    (-b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧ -p_446) -> ( b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0)
c  in CNF:
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨  b^{1, 447}_2
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_1
c     b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨  b^{1, 447}_0
c  in DIMACS:
 2498  2499  2500  446  2501 0
 2498  2499  2500  446 -2502 0
 2498  2499  2500  446  2503 0

c  -1-1 --> -2
c    ( b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧  b^{1, 446}_0 ∧ -p_446) -> ( b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0)
c  in CNF:
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨  b^{1, 447}_2
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨  b^{1, 447}_1
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨  p_446 ∨ -b^{1, 447}_0
c  in DIMACS:
-2498  2499 -2500  446  2501 0
-2498  2499 -2500  446  2502 0
-2498  2499 -2500  446 -2503 0

c  -2-1 --> break 
c    ( b^{1, 446}_2 ∧  b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧ -p_446) -> break
c  in CNF:
c    -b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨  b^{1, 446}_0 ∨  p_446 ∨ break
c  in DIMACS:
-2498 -2499  2500  446 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 446}_2 ∧ -b^{1, 446}_1 ∧ -b^{1, 446}_0 ∧ true) 
c  in CNF:
c    -b^{1, 446}_2 ∨  b^{1, 446}_1 ∨  b^{1, 446}_0 ∨ false 
c  in DIMACS:
-2498  2499  2500  0

c  3 does not represent an automaton state.
c    -(-b^{1, 446}_2 ∧  b^{1, 446}_1 ∧  b^{1, 446}_0 ∧ true) 
c  in CNF:
c     b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ false 
c  in DIMACS:
 2498 -2499 -2500  0
c  -3 does not represent an automaton state.
c    -( b^{1, 446}_2 ∧  b^{1, 446}_1 ∧  b^{1, 446}_0 ∧ true) 
c  in CNF:
c    -b^{1, 446}_2 ∨ -b^{1, 446}_1 ∨ -b^{1, 446}_0 ∨ false 
c  in DIMACS:
-2498 -2499 -2500  0

c i = 447
c  -2+1 --> -1
c    ( b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧  p_447) -> ( b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0)
c  in CNF:
c    -b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨  b^{1, 448}_2
c    -b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_1
c    -b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨  b^{1, 448}_0
c  in DIMACS:
-2501 -2502  2503 -447  2504 0
-2501 -2502  2503 -447 -2505 0
-2501 -2502  2503 -447  2506 0

c  -1+1 --> 0
c    ( b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0 ∧  p_447) -> (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧ -b^{1, 448}_0)
c  in CNF:
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_2
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_1
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_0
c  in DIMACS:
-2501  2502 -2503 -447 -2504 0
-2501  2502 -2503 -447 -2505 0
-2501  2502 -2503 -447 -2506 0

c  0+1 --> 1
c    (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧  p_447) -> (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0)
c  in CNF:
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_2
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_1
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨  b^{1, 448}_0
c  in DIMACS:
 2501  2502  2503 -447 -2504 0
 2501  2502  2503 -447 -2505 0
 2501  2502  2503 -447  2506 0

c  1+1 --> 2
c    (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0 ∧  p_447) -> (-b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0)
c  in CNF:
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_2
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨  b^{1, 448}_1
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ -p_447 ∨ -b^{1, 448}_0
c  in DIMACS:
 2501  2502 -2503 -447 -2504 0
 2501  2502 -2503 -447  2505 0
 2501  2502 -2503 -447 -2506 0

c  2+1 --> break 
c    (-b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧  p_447) -> break
c  in CNF:
c     b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ -p_447 ∨ break
c  in DIMACS:
 2501 -2502  2503 -447 1162 0


c  2-1 --> 1
c    (-b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧ -p_447) -> (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0)
c  in CNF:
c     b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_2
c     b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_1
c     b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨  b^{1, 448}_0
c  in DIMACS:
 2501 -2502  2503  447 -2504 0
 2501 -2502  2503  447 -2505 0
 2501 -2502  2503  447  2506 0

c  1-1 --> 0
c    (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0 ∧ -p_447) -> (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧ -b^{1, 448}_0)
c  in CNF:
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_2
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_1
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_0
c  in DIMACS:
 2501  2502 -2503  447 -2504 0
 2501  2502 -2503  447 -2505 0
 2501  2502 -2503  447 -2506 0

c  0-1 --> -1
c    (-b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧ -p_447) -> ( b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0)
c  in CNF:
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨  b^{1, 448}_2
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_1
c     b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨  b^{1, 448}_0
c  in DIMACS:
 2501  2502  2503  447  2504 0
 2501  2502  2503  447 -2505 0
 2501  2502  2503  447  2506 0

c  -1-1 --> -2
c    ( b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧  b^{1, 447}_0 ∧ -p_447) -> ( b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0)
c  in CNF:
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨  b^{1, 448}_2
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨  b^{1, 448}_1
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨  p_447 ∨ -b^{1, 448}_0
c  in DIMACS:
-2501  2502 -2503  447  2504 0
-2501  2502 -2503  447  2505 0
-2501  2502 -2503  447 -2506 0

c  -2-1 --> break 
c    ( b^{1, 447}_2 ∧  b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧ -p_447) -> break
c  in CNF:
c    -b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨  b^{1, 447}_0 ∨  p_447 ∨ break
c  in DIMACS:
-2501 -2502  2503  447 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 447}_2 ∧ -b^{1, 447}_1 ∧ -b^{1, 447}_0 ∧ true) 
c  in CNF:
c    -b^{1, 447}_2 ∨  b^{1, 447}_1 ∨  b^{1, 447}_0 ∨ false 
c  in DIMACS:
-2501  2502  2503  0

c  3 does not represent an automaton state.
c    -(-b^{1, 447}_2 ∧  b^{1, 447}_1 ∧  b^{1, 447}_0 ∧ true) 
c  in CNF:
c     b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ false 
c  in DIMACS:
 2501 -2502 -2503  0
c  -3 does not represent an automaton state.
c    -( b^{1, 447}_2 ∧  b^{1, 447}_1 ∧  b^{1, 447}_0 ∧ true) 
c  in CNF:
c    -b^{1, 447}_2 ∨ -b^{1, 447}_1 ∨ -b^{1, 447}_0 ∨ false 
c  in DIMACS:
-2501 -2502 -2503  0

c i = 448
c  -2+1 --> -1
c    ( b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧  p_448) -> ( b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0)
c  in CNF:
c    -b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨  b^{1, 449}_2
c    -b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_1
c    -b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨  b^{1, 449}_0
c  in DIMACS:
-2504 -2505  2506 -448  2507 0
-2504 -2505  2506 -448 -2508 0
-2504 -2505  2506 -448  2509 0

c  -1+1 --> 0
c    ( b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0 ∧  p_448) -> (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧ -b^{1, 449}_0)
c  in CNF:
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_2
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_1
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_0
c  in DIMACS:
-2504  2505 -2506 -448 -2507 0
-2504  2505 -2506 -448 -2508 0
-2504  2505 -2506 -448 -2509 0

c  0+1 --> 1
c    (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧  p_448) -> (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0)
c  in CNF:
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_2
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_1
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨  b^{1, 449}_0
c  in DIMACS:
 2504  2505  2506 -448 -2507 0
 2504  2505  2506 -448 -2508 0
 2504  2505  2506 -448  2509 0

c  1+1 --> 2
c    (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0 ∧  p_448) -> (-b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0)
c  in CNF:
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_2
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨  b^{1, 449}_1
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ -p_448 ∨ -b^{1, 449}_0
c  in DIMACS:
 2504  2505 -2506 -448 -2507 0
 2504  2505 -2506 -448  2508 0
 2504  2505 -2506 -448 -2509 0

c  2+1 --> break 
c    (-b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧  p_448) -> break
c  in CNF:
c     b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 2504 -2505  2506 -448 1162 0


c  2-1 --> 1
c    (-b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧ -p_448) -> (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0)
c  in CNF:
c     b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_2
c     b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_1
c     b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨  b^{1, 449}_0
c  in DIMACS:
 2504 -2505  2506  448 -2507 0
 2504 -2505  2506  448 -2508 0
 2504 -2505  2506  448  2509 0

c  1-1 --> 0
c    (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0 ∧ -p_448) -> (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧ -b^{1, 449}_0)
c  in CNF:
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_2
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_1
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_0
c  in DIMACS:
 2504  2505 -2506  448 -2507 0
 2504  2505 -2506  448 -2508 0
 2504  2505 -2506  448 -2509 0

c  0-1 --> -1
c    (-b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧ -p_448) -> ( b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0)
c  in CNF:
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨  b^{1, 449}_2
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_1
c     b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨  b^{1, 449}_0
c  in DIMACS:
 2504  2505  2506  448  2507 0
 2504  2505  2506  448 -2508 0
 2504  2505  2506  448  2509 0

c  -1-1 --> -2
c    ( b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧  b^{1, 448}_0 ∧ -p_448) -> ( b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0)
c  in CNF:
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨  b^{1, 449}_2
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨  b^{1, 449}_1
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨  p_448 ∨ -b^{1, 449}_0
c  in DIMACS:
-2504  2505 -2506  448  2507 0
-2504  2505 -2506  448  2508 0
-2504  2505 -2506  448 -2509 0

c  -2-1 --> break 
c    ( b^{1, 448}_2 ∧  b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨  b^{1, 448}_0 ∨  p_448 ∨ break
c  in DIMACS:
-2504 -2505  2506  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 448}_2 ∧ -b^{1, 448}_1 ∧ -b^{1, 448}_0 ∧ true) 
c  in CNF:
c    -b^{1, 448}_2 ∨  b^{1, 448}_1 ∨  b^{1, 448}_0 ∨ false 
c  in DIMACS:
-2504  2505  2506  0

c  3 does not represent an automaton state.
c    -(-b^{1, 448}_2 ∧  b^{1, 448}_1 ∧  b^{1, 448}_0 ∧ true) 
c  in CNF:
c     b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ false 
c  in DIMACS:
 2504 -2505 -2506  0
c  -3 does not represent an automaton state.
c    -( b^{1, 448}_2 ∧  b^{1, 448}_1 ∧  b^{1, 448}_0 ∧ true) 
c  in CNF:
c    -b^{1, 448}_2 ∨ -b^{1, 448}_1 ∨ -b^{1, 448}_0 ∨ false 
c  in DIMACS:
-2504 -2505 -2506  0

c i = 449
c  -2+1 --> -1
c    ( b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧  p_449) -> ( b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0)
c  in CNF:
c    -b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨  b^{1, 450}_2
c    -b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_1
c    -b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨  b^{1, 450}_0
c  in DIMACS:
-2507 -2508  2509 -449  2510 0
-2507 -2508  2509 -449 -2511 0
-2507 -2508  2509 -449  2512 0

c  -1+1 --> 0
c    ( b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0 ∧  p_449) -> (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧ -b^{1, 450}_0)
c  in CNF:
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_2
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_1
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_0
c  in DIMACS:
-2507  2508 -2509 -449 -2510 0
-2507  2508 -2509 -449 -2511 0
-2507  2508 -2509 -449 -2512 0

c  0+1 --> 1
c    (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧  p_449) -> (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0)
c  in CNF:
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_2
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_1
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨  b^{1, 450}_0
c  in DIMACS:
 2507  2508  2509 -449 -2510 0
 2507  2508  2509 -449 -2511 0
 2507  2508  2509 -449  2512 0

c  1+1 --> 2
c    (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0 ∧  p_449) -> (-b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0)
c  in CNF:
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_2
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨  b^{1, 450}_1
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ -p_449 ∨ -b^{1, 450}_0
c  in DIMACS:
 2507  2508 -2509 -449 -2510 0
 2507  2508 -2509 -449  2511 0
 2507  2508 -2509 -449 -2512 0

c  2+1 --> break 
c    (-b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧  p_449) -> break
c  in CNF:
c     b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ -p_449 ∨ break
c  in DIMACS:
 2507 -2508  2509 -449 1162 0


c  2-1 --> 1
c    (-b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧ -p_449) -> (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0)
c  in CNF:
c     b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_2
c     b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_1
c     b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨  b^{1, 450}_0
c  in DIMACS:
 2507 -2508  2509  449 -2510 0
 2507 -2508  2509  449 -2511 0
 2507 -2508  2509  449  2512 0

c  1-1 --> 0
c    (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0 ∧ -p_449) -> (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧ -b^{1, 450}_0)
c  in CNF:
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_2
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_1
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_0
c  in DIMACS:
 2507  2508 -2509  449 -2510 0
 2507  2508 -2509  449 -2511 0
 2507  2508 -2509  449 -2512 0

c  0-1 --> -1
c    (-b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧ -p_449) -> ( b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0)
c  in CNF:
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨  b^{1, 450}_2
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_1
c     b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨  b^{1, 450}_0
c  in DIMACS:
 2507  2508  2509  449  2510 0
 2507  2508  2509  449 -2511 0
 2507  2508  2509  449  2512 0

c  -1-1 --> -2
c    ( b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧  b^{1, 449}_0 ∧ -p_449) -> ( b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0)
c  in CNF:
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨  b^{1, 450}_2
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨  b^{1, 450}_1
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨  p_449 ∨ -b^{1, 450}_0
c  in DIMACS:
-2507  2508 -2509  449  2510 0
-2507  2508 -2509  449  2511 0
-2507  2508 -2509  449 -2512 0

c  -2-1 --> break 
c    ( b^{1, 449}_2 ∧  b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧ -p_449) -> break
c  in CNF:
c    -b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨  b^{1, 449}_0 ∨  p_449 ∨ break
c  in DIMACS:
-2507 -2508  2509  449 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 449}_2 ∧ -b^{1, 449}_1 ∧ -b^{1, 449}_0 ∧ true) 
c  in CNF:
c    -b^{1, 449}_2 ∨  b^{1, 449}_1 ∨  b^{1, 449}_0 ∨ false 
c  in DIMACS:
-2507  2508  2509  0

c  3 does not represent an automaton state.
c    -(-b^{1, 449}_2 ∧  b^{1, 449}_1 ∧  b^{1, 449}_0 ∧ true) 
c  in CNF:
c     b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ false 
c  in DIMACS:
 2507 -2508 -2509  0
c  -3 does not represent an automaton state.
c    -( b^{1, 449}_2 ∧  b^{1, 449}_1 ∧  b^{1, 449}_0 ∧ true) 
c  in CNF:
c    -b^{1, 449}_2 ∨ -b^{1, 449}_1 ∨ -b^{1, 449}_0 ∨ false 
c  in DIMACS:
-2507 -2508 -2509  0

c i = 450
c  -2+1 --> -1
c    ( b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧  p_450) -> ( b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0)
c  in CNF:
c    -b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨  b^{1, 451}_2
c    -b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_1
c    -b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨  b^{1, 451}_0
c  in DIMACS:
-2510 -2511  2512 -450  2513 0
-2510 -2511  2512 -450 -2514 0
-2510 -2511  2512 -450  2515 0

c  -1+1 --> 0
c    ( b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0 ∧  p_450) -> (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧ -b^{1, 451}_0)
c  in CNF:
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_2
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_1
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_0
c  in DIMACS:
-2510  2511 -2512 -450 -2513 0
-2510  2511 -2512 -450 -2514 0
-2510  2511 -2512 -450 -2515 0

c  0+1 --> 1
c    (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧  p_450) -> (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0)
c  in CNF:
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_2
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_1
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨  b^{1, 451}_0
c  in DIMACS:
 2510  2511  2512 -450 -2513 0
 2510  2511  2512 -450 -2514 0
 2510  2511  2512 -450  2515 0

c  1+1 --> 2
c    (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0 ∧  p_450) -> (-b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0)
c  in CNF:
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_2
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨  b^{1, 451}_1
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ -p_450 ∨ -b^{1, 451}_0
c  in DIMACS:
 2510  2511 -2512 -450 -2513 0
 2510  2511 -2512 -450  2514 0
 2510  2511 -2512 -450 -2515 0

c  2+1 --> break 
c    (-b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧  p_450) -> break
c  in CNF:
c     b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 2510 -2511  2512 -450 1162 0


c  2-1 --> 1
c    (-b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧ -p_450) -> (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0)
c  in CNF:
c     b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_2
c     b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_1
c     b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨  b^{1, 451}_0
c  in DIMACS:
 2510 -2511  2512  450 -2513 0
 2510 -2511  2512  450 -2514 0
 2510 -2511  2512  450  2515 0

c  1-1 --> 0
c    (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0 ∧ -p_450) -> (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧ -b^{1, 451}_0)
c  in CNF:
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_2
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_1
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_0
c  in DIMACS:
 2510  2511 -2512  450 -2513 0
 2510  2511 -2512  450 -2514 0
 2510  2511 -2512  450 -2515 0

c  0-1 --> -1
c    (-b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧ -p_450) -> ( b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0)
c  in CNF:
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨  b^{1, 451}_2
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_1
c     b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨  b^{1, 451}_0
c  in DIMACS:
 2510  2511  2512  450  2513 0
 2510  2511  2512  450 -2514 0
 2510  2511  2512  450  2515 0

c  -1-1 --> -2
c    ( b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧  b^{1, 450}_0 ∧ -p_450) -> ( b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0)
c  in CNF:
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨  b^{1, 451}_2
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨  b^{1, 451}_1
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨  p_450 ∨ -b^{1, 451}_0
c  in DIMACS:
-2510  2511 -2512  450  2513 0
-2510  2511 -2512  450  2514 0
-2510  2511 -2512  450 -2515 0

c  -2-1 --> break 
c    ( b^{1, 450}_2 ∧  b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨  b^{1, 450}_0 ∨  p_450 ∨ break
c  in DIMACS:
-2510 -2511  2512  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 450}_2 ∧ -b^{1, 450}_1 ∧ -b^{1, 450}_0 ∧ true) 
c  in CNF:
c    -b^{1, 450}_2 ∨  b^{1, 450}_1 ∨  b^{1, 450}_0 ∨ false 
c  in DIMACS:
-2510  2511  2512  0

c  3 does not represent an automaton state.
c    -(-b^{1, 450}_2 ∧  b^{1, 450}_1 ∧  b^{1, 450}_0 ∧ true) 
c  in CNF:
c     b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ false 
c  in DIMACS:
 2510 -2511 -2512  0
c  -3 does not represent an automaton state.
c    -( b^{1, 450}_2 ∧  b^{1, 450}_1 ∧  b^{1, 450}_0 ∧ true) 
c  in CNF:
c    -b^{1, 450}_2 ∨ -b^{1, 450}_1 ∨ -b^{1, 450}_0 ∨ false 
c  in DIMACS:
-2510 -2511 -2512  0

c i = 451
c  -2+1 --> -1
c    ( b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧  p_451) -> ( b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0)
c  in CNF:
c    -b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨  b^{1, 452}_2
c    -b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_1
c    -b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨  b^{1, 452}_0
c  in DIMACS:
-2513 -2514  2515 -451  2516 0
-2513 -2514  2515 -451 -2517 0
-2513 -2514  2515 -451  2518 0

c  -1+1 --> 0
c    ( b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0 ∧  p_451) -> (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧ -b^{1, 452}_0)
c  in CNF:
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_2
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_1
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_0
c  in DIMACS:
-2513  2514 -2515 -451 -2516 0
-2513  2514 -2515 -451 -2517 0
-2513  2514 -2515 -451 -2518 0

c  0+1 --> 1
c    (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧  p_451) -> (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0)
c  in CNF:
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_2
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_1
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨  b^{1, 452}_0
c  in DIMACS:
 2513  2514  2515 -451 -2516 0
 2513  2514  2515 -451 -2517 0
 2513  2514  2515 -451  2518 0

c  1+1 --> 2
c    (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0 ∧  p_451) -> (-b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0)
c  in CNF:
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_2
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨  b^{1, 452}_1
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ -p_451 ∨ -b^{1, 452}_0
c  in DIMACS:
 2513  2514 -2515 -451 -2516 0
 2513  2514 -2515 -451  2517 0
 2513  2514 -2515 -451 -2518 0

c  2+1 --> break 
c    (-b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧  p_451) -> break
c  in CNF:
c     b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ -p_451 ∨ break
c  in DIMACS:
 2513 -2514  2515 -451 1162 0


c  2-1 --> 1
c    (-b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧ -p_451) -> (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0)
c  in CNF:
c     b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_2
c     b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_1
c     b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨  b^{1, 452}_0
c  in DIMACS:
 2513 -2514  2515  451 -2516 0
 2513 -2514  2515  451 -2517 0
 2513 -2514  2515  451  2518 0

c  1-1 --> 0
c    (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0 ∧ -p_451) -> (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧ -b^{1, 452}_0)
c  in CNF:
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_2
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_1
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_0
c  in DIMACS:
 2513  2514 -2515  451 -2516 0
 2513  2514 -2515  451 -2517 0
 2513  2514 -2515  451 -2518 0

c  0-1 --> -1
c    (-b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧ -p_451) -> ( b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0)
c  in CNF:
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨  b^{1, 452}_2
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_1
c     b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨  b^{1, 452}_0
c  in DIMACS:
 2513  2514  2515  451  2516 0
 2513  2514  2515  451 -2517 0
 2513  2514  2515  451  2518 0

c  -1-1 --> -2
c    ( b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧  b^{1, 451}_0 ∧ -p_451) -> ( b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0)
c  in CNF:
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨  b^{1, 452}_2
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨  b^{1, 452}_1
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨  p_451 ∨ -b^{1, 452}_0
c  in DIMACS:
-2513  2514 -2515  451  2516 0
-2513  2514 -2515  451  2517 0
-2513  2514 -2515  451 -2518 0

c  -2-1 --> break 
c    ( b^{1, 451}_2 ∧  b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧ -p_451) -> break
c  in CNF:
c    -b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨  b^{1, 451}_0 ∨  p_451 ∨ break
c  in DIMACS:
-2513 -2514  2515  451 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 451}_2 ∧ -b^{1, 451}_1 ∧ -b^{1, 451}_0 ∧ true) 
c  in CNF:
c    -b^{1, 451}_2 ∨  b^{1, 451}_1 ∨  b^{1, 451}_0 ∨ false 
c  in DIMACS:
-2513  2514  2515  0

c  3 does not represent an automaton state.
c    -(-b^{1, 451}_2 ∧  b^{1, 451}_1 ∧  b^{1, 451}_0 ∧ true) 
c  in CNF:
c     b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ false 
c  in DIMACS:
 2513 -2514 -2515  0
c  -3 does not represent an automaton state.
c    -( b^{1, 451}_2 ∧  b^{1, 451}_1 ∧  b^{1, 451}_0 ∧ true) 
c  in CNF:
c    -b^{1, 451}_2 ∨ -b^{1, 451}_1 ∨ -b^{1, 451}_0 ∨ false 
c  in DIMACS:
-2513 -2514 -2515  0

c i = 452
c  -2+1 --> -1
c    ( b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧  p_452) -> ( b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0)
c  in CNF:
c    -b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨  b^{1, 453}_2
c    -b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_1
c    -b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨  b^{1, 453}_0
c  in DIMACS:
-2516 -2517  2518 -452  2519 0
-2516 -2517  2518 -452 -2520 0
-2516 -2517  2518 -452  2521 0

c  -1+1 --> 0
c    ( b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0 ∧  p_452) -> (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧ -b^{1, 453}_0)
c  in CNF:
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_2
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_1
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_0
c  in DIMACS:
-2516  2517 -2518 -452 -2519 0
-2516  2517 -2518 -452 -2520 0
-2516  2517 -2518 -452 -2521 0

c  0+1 --> 1
c    (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧  p_452) -> (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0)
c  in CNF:
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_2
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_1
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨  b^{1, 453}_0
c  in DIMACS:
 2516  2517  2518 -452 -2519 0
 2516  2517  2518 -452 -2520 0
 2516  2517  2518 -452  2521 0

c  1+1 --> 2
c    (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0 ∧  p_452) -> (-b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0)
c  in CNF:
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_2
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨  b^{1, 453}_1
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ -p_452 ∨ -b^{1, 453}_0
c  in DIMACS:
 2516  2517 -2518 -452 -2519 0
 2516  2517 -2518 -452  2520 0
 2516  2517 -2518 -452 -2521 0

c  2+1 --> break 
c    (-b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧  p_452) -> break
c  in CNF:
c     b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ -p_452 ∨ break
c  in DIMACS:
 2516 -2517  2518 -452 1162 0


c  2-1 --> 1
c    (-b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧ -p_452) -> (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0)
c  in CNF:
c     b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_2
c     b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_1
c     b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨  b^{1, 453}_0
c  in DIMACS:
 2516 -2517  2518  452 -2519 0
 2516 -2517  2518  452 -2520 0
 2516 -2517  2518  452  2521 0

c  1-1 --> 0
c    (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0 ∧ -p_452) -> (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧ -b^{1, 453}_0)
c  in CNF:
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_2
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_1
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_0
c  in DIMACS:
 2516  2517 -2518  452 -2519 0
 2516  2517 -2518  452 -2520 0
 2516  2517 -2518  452 -2521 0

c  0-1 --> -1
c    (-b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧ -p_452) -> ( b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0)
c  in CNF:
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨  b^{1, 453}_2
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_1
c     b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨  b^{1, 453}_0
c  in DIMACS:
 2516  2517  2518  452  2519 0
 2516  2517  2518  452 -2520 0
 2516  2517  2518  452  2521 0

c  -1-1 --> -2
c    ( b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧  b^{1, 452}_0 ∧ -p_452) -> ( b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0)
c  in CNF:
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨  b^{1, 453}_2
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨  b^{1, 453}_1
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨  p_452 ∨ -b^{1, 453}_0
c  in DIMACS:
-2516  2517 -2518  452  2519 0
-2516  2517 -2518  452  2520 0
-2516  2517 -2518  452 -2521 0

c  -2-1 --> break 
c    ( b^{1, 452}_2 ∧  b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧ -p_452) -> break
c  in CNF:
c    -b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨  b^{1, 452}_0 ∨  p_452 ∨ break
c  in DIMACS:
-2516 -2517  2518  452 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 452}_2 ∧ -b^{1, 452}_1 ∧ -b^{1, 452}_0 ∧ true) 
c  in CNF:
c    -b^{1, 452}_2 ∨  b^{1, 452}_1 ∨  b^{1, 452}_0 ∨ false 
c  in DIMACS:
-2516  2517  2518  0

c  3 does not represent an automaton state.
c    -(-b^{1, 452}_2 ∧  b^{1, 452}_1 ∧  b^{1, 452}_0 ∧ true) 
c  in CNF:
c     b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ false 
c  in DIMACS:
 2516 -2517 -2518  0
c  -3 does not represent an automaton state.
c    -( b^{1, 452}_2 ∧  b^{1, 452}_1 ∧  b^{1, 452}_0 ∧ true) 
c  in CNF:
c    -b^{1, 452}_2 ∨ -b^{1, 452}_1 ∨ -b^{1, 452}_0 ∨ false 
c  in DIMACS:
-2516 -2517 -2518  0

c i = 453
c  -2+1 --> -1
c    ( b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧  p_453) -> ( b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0)
c  in CNF:
c    -b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨  b^{1, 454}_2
c    -b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_1
c    -b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨  b^{1, 454}_0
c  in DIMACS:
-2519 -2520  2521 -453  2522 0
-2519 -2520  2521 -453 -2523 0
-2519 -2520  2521 -453  2524 0

c  -1+1 --> 0
c    ( b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0 ∧  p_453) -> (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧ -b^{1, 454}_0)
c  in CNF:
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_2
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_1
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_0
c  in DIMACS:
-2519  2520 -2521 -453 -2522 0
-2519  2520 -2521 -453 -2523 0
-2519  2520 -2521 -453 -2524 0

c  0+1 --> 1
c    (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧  p_453) -> (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0)
c  in CNF:
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_2
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_1
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨  b^{1, 454}_0
c  in DIMACS:
 2519  2520  2521 -453 -2522 0
 2519  2520  2521 -453 -2523 0
 2519  2520  2521 -453  2524 0

c  1+1 --> 2
c    (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0 ∧  p_453) -> (-b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0)
c  in CNF:
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_2
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨  b^{1, 454}_1
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ -p_453 ∨ -b^{1, 454}_0
c  in DIMACS:
 2519  2520 -2521 -453 -2522 0
 2519  2520 -2521 -453  2523 0
 2519  2520 -2521 -453 -2524 0

c  2+1 --> break 
c    (-b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧  p_453) -> break
c  in CNF:
c     b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ -p_453 ∨ break
c  in DIMACS:
 2519 -2520  2521 -453 1162 0


c  2-1 --> 1
c    (-b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧ -p_453) -> (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0)
c  in CNF:
c     b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_2
c     b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_1
c     b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨  b^{1, 454}_0
c  in DIMACS:
 2519 -2520  2521  453 -2522 0
 2519 -2520  2521  453 -2523 0
 2519 -2520  2521  453  2524 0

c  1-1 --> 0
c    (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0 ∧ -p_453) -> (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧ -b^{1, 454}_0)
c  in CNF:
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_2
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_1
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_0
c  in DIMACS:
 2519  2520 -2521  453 -2522 0
 2519  2520 -2521  453 -2523 0
 2519  2520 -2521  453 -2524 0

c  0-1 --> -1
c    (-b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧ -p_453) -> ( b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0)
c  in CNF:
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨  b^{1, 454}_2
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_1
c     b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨  b^{1, 454}_0
c  in DIMACS:
 2519  2520  2521  453  2522 0
 2519  2520  2521  453 -2523 0
 2519  2520  2521  453  2524 0

c  -1-1 --> -2
c    ( b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧  b^{1, 453}_0 ∧ -p_453) -> ( b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0)
c  in CNF:
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨  b^{1, 454}_2
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨  b^{1, 454}_1
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨  p_453 ∨ -b^{1, 454}_0
c  in DIMACS:
-2519  2520 -2521  453  2522 0
-2519  2520 -2521  453  2523 0
-2519  2520 -2521  453 -2524 0

c  -2-1 --> break 
c    ( b^{1, 453}_2 ∧  b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧ -p_453) -> break
c  in CNF:
c    -b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨  b^{1, 453}_0 ∨  p_453 ∨ break
c  in DIMACS:
-2519 -2520  2521  453 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 453}_2 ∧ -b^{1, 453}_1 ∧ -b^{1, 453}_0 ∧ true) 
c  in CNF:
c    -b^{1, 453}_2 ∨  b^{1, 453}_1 ∨  b^{1, 453}_0 ∨ false 
c  in DIMACS:
-2519  2520  2521  0

c  3 does not represent an automaton state.
c    -(-b^{1, 453}_2 ∧  b^{1, 453}_1 ∧  b^{1, 453}_0 ∧ true) 
c  in CNF:
c     b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ false 
c  in DIMACS:
 2519 -2520 -2521  0
c  -3 does not represent an automaton state.
c    -( b^{1, 453}_2 ∧  b^{1, 453}_1 ∧  b^{1, 453}_0 ∧ true) 
c  in CNF:
c    -b^{1, 453}_2 ∨ -b^{1, 453}_1 ∨ -b^{1, 453}_0 ∨ false 
c  in DIMACS:
-2519 -2520 -2521  0

c i = 454
c  -2+1 --> -1
c    ( b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧  p_454) -> ( b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0)
c  in CNF:
c    -b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨  b^{1, 455}_2
c    -b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_1
c    -b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨  b^{1, 455}_0
c  in DIMACS:
-2522 -2523  2524 -454  2525 0
-2522 -2523  2524 -454 -2526 0
-2522 -2523  2524 -454  2527 0

c  -1+1 --> 0
c    ( b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0 ∧  p_454) -> (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧ -b^{1, 455}_0)
c  in CNF:
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_2
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_1
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_0
c  in DIMACS:
-2522  2523 -2524 -454 -2525 0
-2522  2523 -2524 -454 -2526 0
-2522  2523 -2524 -454 -2527 0

c  0+1 --> 1
c    (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧  p_454) -> (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0)
c  in CNF:
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_2
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_1
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨  b^{1, 455}_0
c  in DIMACS:
 2522  2523  2524 -454 -2525 0
 2522  2523  2524 -454 -2526 0
 2522  2523  2524 -454  2527 0

c  1+1 --> 2
c    (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0 ∧  p_454) -> (-b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0)
c  in CNF:
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_2
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨  b^{1, 455}_1
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ -p_454 ∨ -b^{1, 455}_0
c  in DIMACS:
 2522  2523 -2524 -454 -2525 0
 2522  2523 -2524 -454  2526 0
 2522  2523 -2524 -454 -2527 0

c  2+1 --> break 
c    (-b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧  p_454) -> break
c  in CNF:
c     b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ -p_454 ∨ break
c  in DIMACS:
 2522 -2523  2524 -454 1162 0


c  2-1 --> 1
c    (-b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧ -p_454) -> (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0)
c  in CNF:
c     b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_2
c     b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_1
c     b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨  b^{1, 455}_0
c  in DIMACS:
 2522 -2523  2524  454 -2525 0
 2522 -2523  2524  454 -2526 0
 2522 -2523  2524  454  2527 0

c  1-1 --> 0
c    (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0 ∧ -p_454) -> (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧ -b^{1, 455}_0)
c  in CNF:
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_2
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_1
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_0
c  in DIMACS:
 2522  2523 -2524  454 -2525 0
 2522  2523 -2524  454 -2526 0
 2522  2523 -2524  454 -2527 0

c  0-1 --> -1
c    (-b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧ -p_454) -> ( b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0)
c  in CNF:
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨  b^{1, 455}_2
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_1
c     b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨  b^{1, 455}_0
c  in DIMACS:
 2522  2523  2524  454  2525 0
 2522  2523  2524  454 -2526 0
 2522  2523  2524  454  2527 0

c  -1-1 --> -2
c    ( b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧  b^{1, 454}_0 ∧ -p_454) -> ( b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0)
c  in CNF:
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨  b^{1, 455}_2
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨  b^{1, 455}_1
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨  p_454 ∨ -b^{1, 455}_0
c  in DIMACS:
-2522  2523 -2524  454  2525 0
-2522  2523 -2524  454  2526 0
-2522  2523 -2524  454 -2527 0

c  -2-1 --> break 
c    ( b^{1, 454}_2 ∧  b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧ -p_454) -> break
c  in CNF:
c    -b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨  b^{1, 454}_0 ∨  p_454 ∨ break
c  in DIMACS:
-2522 -2523  2524  454 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 454}_2 ∧ -b^{1, 454}_1 ∧ -b^{1, 454}_0 ∧ true) 
c  in CNF:
c    -b^{1, 454}_2 ∨  b^{1, 454}_1 ∨  b^{1, 454}_0 ∨ false 
c  in DIMACS:
-2522  2523  2524  0

c  3 does not represent an automaton state.
c    -(-b^{1, 454}_2 ∧  b^{1, 454}_1 ∧  b^{1, 454}_0 ∧ true) 
c  in CNF:
c     b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ false 
c  in DIMACS:
 2522 -2523 -2524  0
c  -3 does not represent an automaton state.
c    -( b^{1, 454}_2 ∧  b^{1, 454}_1 ∧  b^{1, 454}_0 ∧ true) 
c  in CNF:
c    -b^{1, 454}_2 ∨ -b^{1, 454}_1 ∨ -b^{1, 454}_0 ∨ false 
c  in DIMACS:
-2522 -2523 -2524  0

c i = 455
c  -2+1 --> -1
c    ( b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧  p_455) -> ( b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0)
c  in CNF:
c    -b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨  b^{1, 456}_2
c    -b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_1
c    -b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨  b^{1, 456}_0
c  in DIMACS:
-2525 -2526  2527 -455  2528 0
-2525 -2526  2527 -455 -2529 0
-2525 -2526  2527 -455  2530 0

c  -1+1 --> 0
c    ( b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0 ∧  p_455) -> (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧ -b^{1, 456}_0)
c  in CNF:
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_2
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_1
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_0
c  in DIMACS:
-2525  2526 -2527 -455 -2528 0
-2525  2526 -2527 -455 -2529 0
-2525  2526 -2527 -455 -2530 0

c  0+1 --> 1
c    (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧  p_455) -> (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0)
c  in CNF:
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_2
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_1
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨  b^{1, 456}_0
c  in DIMACS:
 2525  2526  2527 -455 -2528 0
 2525  2526  2527 -455 -2529 0
 2525  2526  2527 -455  2530 0

c  1+1 --> 2
c    (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0 ∧  p_455) -> (-b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0)
c  in CNF:
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_2
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨  b^{1, 456}_1
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ -p_455 ∨ -b^{1, 456}_0
c  in DIMACS:
 2525  2526 -2527 -455 -2528 0
 2525  2526 -2527 -455  2529 0
 2525  2526 -2527 -455 -2530 0

c  2+1 --> break 
c    (-b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧  p_455) -> break
c  in CNF:
c     b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 2525 -2526  2527 -455 1162 0


c  2-1 --> 1
c    (-b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧ -p_455) -> (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0)
c  in CNF:
c     b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_2
c     b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_1
c     b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨  b^{1, 456}_0
c  in DIMACS:
 2525 -2526  2527  455 -2528 0
 2525 -2526  2527  455 -2529 0
 2525 -2526  2527  455  2530 0

c  1-1 --> 0
c    (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0 ∧ -p_455) -> (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧ -b^{1, 456}_0)
c  in CNF:
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_2
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_1
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_0
c  in DIMACS:
 2525  2526 -2527  455 -2528 0
 2525  2526 -2527  455 -2529 0
 2525  2526 -2527  455 -2530 0

c  0-1 --> -1
c    (-b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧ -p_455) -> ( b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0)
c  in CNF:
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨  b^{1, 456}_2
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_1
c     b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨  b^{1, 456}_0
c  in DIMACS:
 2525  2526  2527  455  2528 0
 2525  2526  2527  455 -2529 0
 2525  2526  2527  455  2530 0

c  -1-1 --> -2
c    ( b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧  b^{1, 455}_0 ∧ -p_455) -> ( b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0)
c  in CNF:
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨  b^{1, 456}_2
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨  b^{1, 456}_1
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨  p_455 ∨ -b^{1, 456}_0
c  in DIMACS:
-2525  2526 -2527  455  2528 0
-2525  2526 -2527  455  2529 0
-2525  2526 -2527  455 -2530 0

c  -2-1 --> break 
c    ( b^{1, 455}_2 ∧  b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨  b^{1, 455}_0 ∨  p_455 ∨ break
c  in DIMACS:
-2525 -2526  2527  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 455}_2 ∧ -b^{1, 455}_1 ∧ -b^{1, 455}_0 ∧ true) 
c  in CNF:
c    -b^{1, 455}_2 ∨  b^{1, 455}_1 ∨  b^{1, 455}_0 ∨ false 
c  in DIMACS:
-2525  2526  2527  0

c  3 does not represent an automaton state.
c    -(-b^{1, 455}_2 ∧  b^{1, 455}_1 ∧  b^{1, 455}_0 ∧ true) 
c  in CNF:
c     b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ false 
c  in DIMACS:
 2525 -2526 -2527  0
c  -3 does not represent an automaton state.
c    -( b^{1, 455}_2 ∧  b^{1, 455}_1 ∧  b^{1, 455}_0 ∧ true) 
c  in CNF:
c    -b^{1, 455}_2 ∨ -b^{1, 455}_1 ∨ -b^{1, 455}_0 ∨ false 
c  in DIMACS:
-2525 -2526 -2527  0

c i = 456
c  -2+1 --> -1
c    ( b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧  p_456) -> ( b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0)
c  in CNF:
c    -b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨  b^{1, 457}_2
c    -b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_1
c    -b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨  b^{1, 457}_0
c  in DIMACS:
-2528 -2529  2530 -456  2531 0
-2528 -2529  2530 -456 -2532 0
-2528 -2529  2530 -456  2533 0

c  -1+1 --> 0
c    ( b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0 ∧  p_456) -> (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧ -b^{1, 457}_0)
c  in CNF:
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_2
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_1
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_0
c  in DIMACS:
-2528  2529 -2530 -456 -2531 0
-2528  2529 -2530 -456 -2532 0
-2528  2529 -2530 -456 -2533 0

c  0+1 --> 1
c    (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧  p_456) -> (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0)
c  in CNF:
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_2
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_1
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨  b^{1, 457}_0
c  in DIMACS:
 2528  2529  2530 -456 -2531 0
 2528  2529  2530 -456 -2532 0
 2528  2529  2530 -456  2533 0

c  1+1 --> 2
c    (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0 ∧  p_456) -> (-b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0)
c  in CNF:
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_2
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨  b^{1, 457}_1
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ -p_456 ∨ -b^{1, 457}_0
c  in DIMACS:
 2528  2529 -2530 -456 -2531 0
 2528  2529 -2530 -456  2532 0
 2528  2529 -2530 -456 -2533 0

c  2+1 --> break 
c    (-b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧  p_456) -> break
c  in CNF:
c     b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 2528 -2529  2530 -456 1162 0


c  2-1 --> 1
c    (-b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧ -p_456) -> (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0)
c  in CNF:
c     b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_2
c     b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_1
c     b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨  b^{1, 457}_0
c  in DIMACS:
 2528 -2529  2530  456 -2531 0
 2528 -2529  2530  456 -2532 0
 2528 -2529  2530  456  2533 0

c  1-1 --> 0
c    (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0 ∧ -p_456) -> (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧ -b^{1, 457}_0)
c  in CNF:
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_2
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_1
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_0
c  in DIMACS:
 2528  2529 -2530  456 -2531 0
 2528  2529 -2530  456 -2532 0
 2528  2529 -2530  456 -2533 0

c  0-1 --> -1
c    (-b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧ -p_456) -> ( b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0)
c  in CNF:
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨  b^{1, 457}_2
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_1
c     b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨  b^{1, 457}_0
c  in DIMACS:
 2528  2529  2530  456  2531 0
 2528  2529  2530  456 -2532 0
 2528  2529  2530  456  2533 0

c  -1-1 --> -2
c    ( b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧  b^{1, 456}_0 ∧ -p_456) -> ( b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0)
c  in CNF:
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨  b^{1, 457}_2
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨  b^{1, 457}_1
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨  p_456 ∨ -b^{1, 457}_0
c  in DIMACS:
-2528  2529 -2530  456  2531 0
-2528  2529 -2530  456  2532 0
-2528  2529 -2530  456 -2533 0

c  -2-1 --> break 
c    ( b^{1, 456}_2 ∧  b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨  b^{1, 456}_0 ∨  p_456 ∨ break
c  in DIMACS:
-2528 -2529  2530  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 456}_2 ∧ -b^{1, 456}_1 ∧ -b^{1, 456}_0 ∧ true) 
c  in CNF:
c    -b^{1, 456}_2 ∨  b^{1, 456}_1 ∨  b^{1, 456}_0 ∨ false 
c  in DIMACS:
-2528  2529  2530  0

c  3 does not represent an automaton state.
c    -(-b^{1, 456}_2 ∧  b^{1, 456}_1 ∧  b^{1, 456}_0 ∧ true) 
c  in CNF:
c     b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ false 
c  in DIMACS:
 2528 -2529 -2530  0
c  -3 does not represent an automaton state.
c    -( b^{1, 456}_2 ∧  b^{1, 456}_1 ∧  b^{1, 456}_0 ∧ true) 
c  in CNF:
c    -b^{1, 456}_2 ∨ -b^{1, 456}_1 ∨ -b^{1, 456}_0 ∨ false 
c  in DIMACS:
-2528 -2529 -2530  0

c i = 457
c  -2+1 --> -1
c    ( b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧  p_457) -> ( b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0)
c  in CNF:
c    -b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨  b^{1, 458}_2
c    -b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_1
c    -b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨  b^{1, 458}_0
c  in DIMACS:
-2531 -2532  2533 -457  2534 0
-2531 -2532  2533 -457 -2535 0
-2531 -2532  2533 -457  2536 0

c  -1+1 --> 0
c    ( b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0 ∧  p_457) -> (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧ -b^{1, 458}_0)
c  in CNF:
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_2
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_1
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_0
c  in DIMACS:
-2531  2532 -2533 -457 -2534 0
-2531  2532 -2533 -457 -2535 0
-2531  2532 -2533 -457 -2536 0

c  0+1 --> 1
c    (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧  p_457) -> (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0)
c  in CNF:
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_2
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_1
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨  b^{1, 458}_0
c  in DIMACS:
 2531  2532  2533 -457 -2534 0
 2531  2532  2533 -457 -2535 0
 2531  2532  2533 -457  2536 0

c  1+1 --> 2
c    (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0 ∧  p_457) -> (-b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0)
c  in CNF:
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_2
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨  b^{1, 458}_1
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ -p_457 ∨ -b^{1, 458}_0
c  in DIMACS:
 2531  2532 -2533 -457 -2534 0
 2531  2532 -2533 -457  2535 0
 2531  2532 -2533 -457 -2536 0

c  2+1 --> break 
c    (-b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧  p_457) -> break
c  in CNF:
c     b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ -p_457 ∨ break
c  in DIMACS:
 2531 -2532  2533 -457 1162 0


c  2-1 --> 1
c    (-b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧ -p_457) -> (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0)
c  in CNF:
c     b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_2
c     b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_1
c     b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨  b^{1, 458}_0
c  in DIMACS:
 2531 -2532  2533  457 -2534 0
 2531 -2532  2533  457 -2535 0
 2531 -2532  2533  457  2536 0

c  1-1 --> 0
c    (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0 ∧ -p_457) -> (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧ -b^{1, 458}_0)
c  in CNF:
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_2
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_1
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_0
c  in DIMACS:
 2531  2532 -2533  457 -2534 0
 2531  2532 -2533  457 -2535 0
 2531  2532 -2533  457 -2536 0

c  0-1 --> -1
c    (-b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧ -p_457) -> ( b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0)
c  in CNF:
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨  b^{1, 458}_2
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_1
c     b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨  b^{1, 458}_0
c  in DIMACS:
 2531  2532  2533  457  2534 0
 2531  2532  2533  457 -2535 0
 2531  2532  2533  457  2536 0

c  -1-1 --> -2
c    ( b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧  b^{1, 457}_0 ∧ -p_457) -> ( b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0)
c  in CNF:
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨  b^{1, 458}_2
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨  b^{1, 458}_1
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨  p_457 ∨ -b^{1, 458}_0
c  in DIMACS:
-2531  2532 -2533  457  2534 0
-2531  2532 -2533  457  2535 0
-2531  2532 -2533  457 -2536 0

c  -2-1 --> break 
c    ( b^{1, 457}_2 ∧  b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧ -p_457) -> break
c  in CNF:
c    -b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨  b^{1, 457}_0 ∨  p_457 ∨ break
c  in DIMACS:
-2531 -2532  2533  457 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 457}_2 ∧ -b^{1, 457}_1 ∧ -b^{1, 457}_0 ∧ true) 
c  in CNF:
c    -b^{1, 457}_2 ∨  b^{1, 457}_1 ∨  b^{1, 457}_0 ∨ false 
c  in DIMACS:
-2531  2532  2533  0

c  3 does not represent an automaton state.
c    -(-b^{1, 457}_2 ∧  b^{1, 457}_1 ∧  b^{1, 457}_0 ∧ true) 
c  in CNF:
c     b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ false 
c  in DIMACS:
 2531 -2532 -2533  0
c  -3 does not represent an automaton state.
c    -( b^{1, 457}_2 ∧  b^{1, 457}_1 ∧  b^{1, 457}_0 ∧ true) 
c  in CNF:
c    -b^{1, 457}_2 ∨ -b^{1, 457}_1 ∨ -b^{1, 457}_0 ∨ false 
c  in DIMACS:
-2531 -2532 -2533  0

c i = 458
c  -2+1 --> -1
c    ( b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧  p_458) -> ( b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0)
c  in CNF:
c    -b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨  b^{1, 459}_2
c    -b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_1
c    -b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨  b^{1, 459}_0
c  in DIMACS:
-2534 -2535  2536 -458  2537 0
-2534 -2535  2536 -458 -2538 0
-2534 -2535  2536 -458  2539 0

c  -1+1 --> 0
c    ( b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0 ∧  p_458) -> (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧ -b^{1, 459}_0)
c  in CNF:
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_2
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_1
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_0
c  in DIMACS:
-2534  2535 -2536 -458 -2537 0
-2534  2535 -2536 -458 -2538 0
-2534  2535 -2536 -458 -2539 0

c  0+1 --> 1
c    (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧  p_458) -> (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0)
c  in CNF:
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_2
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_1
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨  b^{1, 459}_0
c  in DIMACS:
 2534  2535  2536 -458 -2537 0
 2534  2535  2536 -458 -2538 0
 2534  2535  2536 -458  2539 0

c  1+1 --> 2
c    (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0 ∧  p_458) -> (-b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0)
c  in CNF:
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_2
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨  b^{1, 459}_1
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ -p_458 ∨ -b^{1, 459}_0
c  in DIMACS:
 2534  2535 -2536 -458 -2537 0
 2534  2535 -2536 -458  2538 0
 2534  2535 -2536 -458 -2539 0

c  2+1 --> break 
c    (-b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧  p_458) -> break
c  in CNF:
c     b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ -p_458 ∨ break
c  in DIMACS:
 2534 -2535  2536 -458 1162 0


c  2-1 --> 1
c    (-b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧ -p_458) -> (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0)
c  in CNF:
c     b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_2
c     b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_1
c     b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨  b^{1, 459}_0
c  in DIMACS:
 2534 -2535  2536  458 -2537 0
 2534 -2535  2536  458 -2538 0
 2534 -2535  2536  458  2539 0

c  1-1 --> 0
c    (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0 ∧ -p_458) -> (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧ -b^{1, 459}_0)
c  in CNF:
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_2
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_1
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_0
c  in DIMACS:
 2534  2535 -2536  458 -2537 0
 2534  2535 -2536  458 -2538 0
 2534  2535 -2536  458 -2539 0

c  0-1 --> -1
c    (-b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧ -p_458) -> ( b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0)
c  in CNF:
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨  b^{1, 459}_2
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_1
c     b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨  b^{1, 459}_0
c  in DIMACS:
 2534  2535  2536  458  2537 0
 2534  2535  2536  458 -2538 0
 2534  2535  2536  458  2539 0

c  -1-1 --> -2
c    ( b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧  b^{1, 458}_0 ∧ -p_458) -> ( b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0)
c  in CNF:
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨  b^{1, 459}_2
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨  b^{1, 459}_1
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨  p_458 ∨ -b^{1, 459}_0
c  in DIMACS:
-2534  2535 -2536  458  2537 0
-2534  2535 -2536  458  2538 0
-2534  2535 -2536  458 -2539 0

c  -2-1 --> break 
c    ( b^{1, 458}_2 ∧  b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧ -p_458) -> break
c  in CNF:
c    -b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨  b^{1, 458}_0 ∨  p_458 ∨ break
c  in DIMACS:
-2534 -2535  2536  458 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 458}_2 ∧ -b^{1, 458}_1 ∧ -b^{1, 458}_0 ∧ true) 
c  in CNF:
c    -b^{1, 458}_2 ∨  b^{1, 458}_1 ∨  b^{1, 458}_0 ∨ false 
c  in DIMACS:
-2534  2535  2536  0

c  3 does not represent an automaton state.
c    -(-b^{1, 458}_2 ∧  b^{1, 458}_1 ∧  b^{1, 458}_0 ∧ true) 
c  in CNF:
c     b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ false 
c  in DIMACS:
 2534 -2535 -2536  0
c  -3 does not represent an automaton state.
c    -( b^{1, 458}_2 ∧  b^{1, 458}_1 ∧  b^{1, 458}_0 ∧ true) 
c  in CNF:
c    -b^{1, 458}_2 ∨ -b^{1, 458}_1 ∨ -b^{1, 458}_0 ∨ false 
c  in DIMACS:
-2534 -2535 -2536  0

c i = 459
c  -2+1 --> -1
c    ( b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧  p_459) -> ( b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0)
c  in CNF:
c    -b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨  b^{1, 460}_2
c    -b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_1
c    -b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨  b^{1, 460}_0
c  in DIMACS:
-2537 -2538  2539 -459  2540 0
-2537 -2538  2539 -459 -2541 0
-2537 -2538  2539 -459  2542 0

c  -1+1 --> 0
c    ( b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0 ∧  p_459) -> (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧ -b^{1, 460}_0)
c  in CNF:
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_2
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_1
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_0
c  in DIMACS:
-2537  2538 -2539 -459 -2540 0
-2537  2538 -2539 -459 -2541 0
-2537  2538 -2539 -459 -2542 0

c  0+1 --> 1
c    (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧  p_459) -> (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0)
c  in CNF:
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_2
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_1
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨  b^{1, 460}_0
c  in DIMACS:
 2537  2538  2539 -459 -2540 0
 2537  2538  2539 -459 -2541 0
 2537  2538  2539 -459  2542 0

c  1+1 --> 2
c    (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0 ∧  p_459) -> (-b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0)
c  in CNF:
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_2
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨  b^{1, 460}_1
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ -p_459 ∨ -b^{1, 460}_0
c  in DIMACS:
 2537  2538 -2539 -459 -2540 0
 2537  2538 -2539 -459  2541 0
 2537  2538 -2539 -459 -2542 0

c  2+1 --> break 
c    (-b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧  p_459) -> break
c  in CNF:
c     b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 2537 -2538  2539 -459 1162 0


c  2-1 --> 1
c    (-b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧ -p_459) -> (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0)
c  in CNF:
c     b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_2
c     b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_1
c     b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨  b^{1, 460}_0
c  in DIMACS:
 2537 -2538  2539  459 -2540 0
 2537 -2538  2539  459 -2541 0
 2537 -2538  2539  459  2542 0

c  1-1 --> 0
c    (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0 ∧ -p_459) -> (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧ -b^{1, 460}_0)
c  in CNF:
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_2
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_1
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_0
c  in DIMACS:
 2537  2538 -2539  459 -2540 0
 2537  2538 -2539  459 -2541 0
 2537  2538 -2539  459 -2542 0

c  0-1 --> -1
c    (-b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧ -p_459) -> ( b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0)
c  in CNF:
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨  b^{1, 460}_2
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_1
c     b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨  b^{1, 460}_0
c  in DIMACS:
 2537  2538  2539  459  2540 0
 2537  2538  2539  459 -2541 0
 2537  2538  2539  459  2542 0

c  -1-1 --> -2
c    ( b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧  b^{1, 459}_0 ∧ -p_459) -> ( b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0)
c  in CNF:
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨  b^{1, 460}_2
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨  b^{1, 460}_1
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨  p_459 ∨ -b^{1, 460}_0
c  in DIMACS:
-2537  2538 -2539  459  2540 0
-2537  2538 -2539  459  2541 0
-2537  2538 -2539  459 -2542 0

c  -2-1 --> break 
c    ( b^{1, 459}_2 ∧  b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨  b^{1, 459}_0 ∨  p_459 ∨ break
c  in DIMACS:
-2537 -2538  2539  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 459}_2 ∧ -b^{1, 459}_1 ∧ -b^{1, 459}_0 ∧ true) 
c  in CNF:
c    -b^{1, 459}_2 ∨  b^{1, 459}_1 ∨  b^{1, 459}_0 ∨ false 
c  in DIMACS:
-2537  2538  2539  0

c  3 does not represent an automaton state.
c    -(-b^{1, 459}_2 ∧  b^{1, 459}_1 ∧  b^{1, 459}_0 ∧ true) 
c  in CNF:
c     b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ false 
c  in DIMACS:
 2537 -2538 -2539  0
c  -3 does not represent an automaton state.
c    -( b^{1, 459}_2 ∧  b^{1, 459}_1 ∧  b^{1, 459}_0 ∧ true) 
c  in CNF:
c    -b^{1, 459}_2 ∨ -b^{1, 459}_1 ∨ -b^{1, 459}_0 ∨ false 
c  in DIMACS:
-2537 -2538 -2539  0

c i = 460
c  -2+1 --> -1
c    ( b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧  p_460) -> ( b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0)
c  in CNF:
c    -b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨  b^{1, 461}_2
c    -b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_1
c    -b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨  b^{1, 461}_0
c  in DIMACS:
-2540 -2541  2542 -460  2543 0
-2540 -2541  2542 -460 -2544 0
-2540 -2541  2542 -460  2545 0

c  -1+1 --> 0
c    ( b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0 ∧  p_460) -> (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧ -b^{1, 461}_0)
c  in CNF:
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_2
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_1
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_0
c  in DIMACS:
-2540  2541 -2542 -460 -2543 0
-2540  2541 -2542 -460 -2544 0
-2540  2541 -2542 -460 -2545 0

c  0+1 --> 1
c    (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧  p_460) -> (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0)
c  in CNF:
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_2
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_1
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨  b^{1, 461}_0
c  in DIMACS:
 2540  2541  2542 -460 -2543 0
 2540  2541  2542 -460 -2544 0
 2540  2541  2542 -460  2545 0

c  1+1 --> 2
c    (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0 ∧  p_460) -> (-b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0)
c  in CNF:
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_2
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨  b^{1, 461}_1
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ -p_460 ∨ -b^{1, 461}_0
c  in DIMACS:
 2540  2541 -2542 -460 -2543 0
 2540  2541 -2542 -460  2544 0
 2540  2541 -2542 -460 -2545 0

c  2+1 --> break 
c    (-b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧  p_460) -> break
c  in CNF:
c     b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 2540 -2541  2542 -460 1162 0


c  2-1 --> 1
c    (-b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧ -p_460) -> (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0)
c  in CNF:
c     b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_2
c     b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_1
c     b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨  b^{1, 461}_0
c  in DIMACS:
 2540 -2541  2542  460 -2543 0
 2540 -2541  2542  460 -2544 0
 2540 -2541  2542  460  2545 0

c  1-1 --> 0
c    (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0 ∧ -p_460) -> (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧ -b^{1, 461}_0)
c  in CNF:
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_2
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_1
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_0
c  in DIMACS:
 2540  2541 -2542  460 -2543 0
 2540  2541 -2542  460 -2544 0
 2540  2541 -2542  460 -2545 0

c  0-1 --> -1
c    (-b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧ -p_460) -> ( b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0)
c  in CNF:
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨  b^{1, 461}_2
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_1
c     b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨  b^{1, 461}_0
c  in DIMACS:
 2540  2541  2542  460  2543 0
 2540  2541  2542  460 -2544 0
 2540  2541  2542  460  2545 0

c  -1-1 --> -2
c    ( b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧  b^{1, 460}_0 ∧ -p_460) -> ( b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0)
c  in CNF:
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨  b^{1, 461}_2
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨  b^{1, 461}_1
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨  p_460 ∨ -b^{1, 461}_0
c  in DIMACS:
-2540  2541 -2542  460  2543 0
-2540  2541 -2542  460  2544 0
-2540  2541 -2542  460 -2545 0

c  -2-1 --> break 
c    ( b^{1, 460}_2 ∧  b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨  b^{1, 460}_0 ∨  p_460 ∨ break
c  in DIMACS:
-2540 -2541  2542  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 460}_2 ∧ -b^{1, 460}_1 ∧ -b^{1, 460}_0 ∧ true) 
c  in CNF:
c    -b^{1, 460}_2 ∨  b^{1, 460}_1 ∨  b^{1, 460}_0 ∨ false 
c  in DIMACS:
-2540  2541  2542  0

c  3 does not represent an automaton state.
c    -(-b^{1, 460}_2 ∧  b^{1, 460}_1 ∧  b^{1, 460}_0 ∧ true) 
c  in CNF:
c     b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ false 
c  in DIMACS:
 2540 -2541 -2542  0
c  -3 does not represent an automaton state.
c    -( b^{1, 460}_2 ∧  b^{1, 460}_1 ∧  b^{1, 460}_0 ∧ true) 
c  in CNF:
c    -b^{1, 460}_2 ∨ -b^{1, 460}_1 ∨ -b^{1, 460}_0 ∨ false 
c  in DIMACS:
-2540 -2541 -2542  0

c i = 461
c  -2+1 --> -1
c    ( b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧  p_461) -> ( b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0)
c  in CNF:
c    -b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨  b^{1, 462}_2
c    -b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_1
c    -b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨  b^{1, 462}_0
c  in DIMACS:
-2543 -2544  2545 -461  2546 0
-2543 -2544  2545 -461 -2547 0
-2543 -2544  2545 -461  2548 0

c  -1+1 --> 0
c    ( b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0 ∧  p_461) -> (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧ -b^{1, 462}_0)
c  in CNF:
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_2
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_1
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_0
c  in DIMACS:
-2543  2544 -2545 -461 -2546 0
-2543  2544 -2545 -461 -2547 0
-2543  2544 -2545 -461 -2548 0

c  0+1 --> 1
c    (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧  p_461) -> (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0)
c  in CNF:
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_2
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_1
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨  b^{1, 462}_0
c  in DIMACS:
 2543  2544  2545 -461 -2546 0
 2543  2544  2545 -461 -2547 0
 2543  2544  2545 -461  2548 0

c  1+1 --> 2
c    (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0 ∧  p_461) -> (-b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0)
c  in CNF:
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_2
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨  b^{1, 462}_1
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ -p_461 ∨ -b^{1, 462}_0
c  in DIMACS:
 2543  2544 -2545 -461 -2546 0
 2543  2544 -2545 -461  2547 0
 2543  2544 -2545 -461 -2548 0

c  2+1 --> break 
c    (-b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧  p_461) -> break
c  in CNF:
c     b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ -p_461 ∨ break
c  in DIMACS:
 2543 -2544  2545 -461 1162 0


c  2-1 --> 1
c    (-b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧ -p_461) -> (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0)
c  in CNF:
c     b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_2
c     b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_1
c     b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨  b^{1, 462}_0
c  in DIMACS:
 2543 -2544  2545  461 -2546 0
 2543 -2544  2545  461 -2547 0
 2543 -2544  2545  461  2548 0

c  1-1 --> 0
c    (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0 ∧ -p_461) -> (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧ -b^{1, 462}_0)
c  in CNF:
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_2
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_1
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_0
c  in DIMACS:
 2543  2544 -2545  461 -2546 0
 2543  2544 -2545  461 -2547 0
 2543  2544 -2545  461 -2548 0

c  0-1 --> -1
c    (-b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧ -p_461) -> ( b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0)
c  in CNF:
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨  b^{1, 462}_2
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_1
c     b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨  b^{1, 462}_0
c  in DIMACS:
 2543  2544  2545  461  2546 0
 2543  2544  2545  461 -2547 0
 2543  2544  2545  461  2548 0

c  -1-1 --> -2
c    ( b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧  b^{1, 461}_0 ∧ -p_461) -> ( b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0)
c  in CNF:
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨  b^{1, 462}_2
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨  b^{1, 462}_1
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨  p_461 ∨ -b^{1, 462}_0
c  in DIMACS:
-2543  2544 -2545  461  2546 0
-2543  2544 -2545  461  2547 0
-2543  2544 -2545  461 -2548 0

c  -2-1 --> break 
c    ( b^{1, 461}_2 ∧  b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧ -p_461) -> break
c  in CNF:
c    -b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨  b^{1, 461}_0 ∨  p_461 ∨ break
c  in DIMACS:
-2543 -2544  2545  461 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 461}_2 ∧ -b^{1, 461}_1 ∧ -b^{1, 461}_0 ∧ true) 
c  in CNF:
c    -b^{1, 461}_2 ∨  b^{1, 461}_1 ∨  b^{1, 461}_0 ∨ false 
c  in DIMACS:
-2543  2544  2545  0

c  3 does not represent an automaton state.
c    -(-b^{1, 461}_2 ∧  b^{1, 461}_1 ∧  b^{1, 461}_0 ∧ true) 
c  in CNF:
c     b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ false 
c  in DIMACS:
 2543 -2544 -2545  0
c  -3 does not represent an automaton state.
c    -( b^{1, 461}_2 ∧  b^{1, 461}_1 ∧  b^{1, 461}_0 ∧ true) 
c  in CNF:
c    -b^{1, 461}_2 ∨ -b^{1, 461}_1 ∨ -b^{1, 461}_0 ∨ false 
c  in DIMACS:
-2543 -2544 -2545  0

c i = 462
c  -2+1 --> -1
c    ( b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧  p_462) -> ( b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0)
c  in CNF:
c    -b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨  b^{1, 463}_2
c    -b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_1
c    -b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨  b^{1, 463}_0
c  in DIMACS:
-2546 -2547  2548 -462  2549 0
-2546 -2547  2548 -462 -2550 0
-2546 -2547  2548 -462  2551 0

c  -1+1 --> 0
c    ( b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0 ∧  p_462) -> (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧ -b^{1, 463}_0)
c  in CNF:
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_2
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_1
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_0
c  in DIMACS:
-2546  2547 -2548 -462 -2549 0
-2546  2547 -2548 -462 -2550 0
-2546  2547 -2548 -462 -2551 0

c  0+1 --> 1
c    (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧  p_462) -> (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0)
c  in CNF:
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_2
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_1
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨  b^{1, 463}_0
c  in DIMACS:
 2546  2547  2548 -462 -2549 0
 2546  2547  2548 -462 -2550 0
 2546  2547  2548 -462  2551 0

c  1+1 --> 2
c    (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0 ∧  p_462) -> (-b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0)
c  in CNF:
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_2
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨  b^{1, 463}_1
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ -p_462 ∨ -b^{1, 463}_0
c  in DIMACS:
 2546  2547 -2548 -462 -2549 0
 2546  2547 -2548 -462  2550 0
 2546  2547 -2548 -462 -2551 0

c  2+1 --> break 
c    (-b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧  p_462) -> break
c  in CNF:
c     b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 2546 -2547  2548 -462 1162 0


c  2-1 --> 1
c    (-b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧ -p_462) -> (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0)
c  in CNF:
c     b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_2
c     b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_1
c     b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨  b^{1, 463}_0
c  in DIMACS:
 2546 -2547  2548  462 -2549 0
 2546 -2547  2548  462 -2550 0
 2546 -2547  2548  462  2551 0

c  1-1 --> 0
c    (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0 ∧ -p_462) -> (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧ -b^{1, 463}_0)
c  in CNF:
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_2
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_1
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_0
c  in DIMACS:
 2546  2547 -2548  462 -2549 0
 2546  2547 -2548  462 -2550 0
 2546  2547 -2548  462 -2551 0

c  0-1 --> -1
c    (-b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧ -p_462) -> ( b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0)
c  in CNF:
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨  b^{1, 463}_2
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_1
c     b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨  b^{1, 463}_0
c  in DIMACS:
 2546  2547  2548  462  2549 0
 2546  2547  2548  462 -2550 0
 2546  2547  2548  462  2551 0

c  -1-1 --> -2
c    ( b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧  b^{1, 462}_0 ∧ -p_462) -> ( b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0)
c  in CNF:
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨  b^{1, 463}_2
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨  b^{1, 463}_1
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨  p_462 ∨ -b^{1, 463}_0
c  in DIMACS:
-2546  2547 -2548  462  2549 0
-2546  2547 -2548  462  2550 0
-2546  2547 -2548  462 -2551 0

c  -2-1 --> break 
c    ( b^{1, 462}_2 ∧  b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨  b^{1, 462}_0 ∨  p_462 ∨ break
c  in DIMACS:
-2546 -2547  2548  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 462}_2 ∧ -b^{1, 462}_1 ∧ -b^{1, 462}_0 ∧ true) 
c  in CNF:
c    -b^{1, 462}_2 ∨  b^{1, 462}_1 ∨  b^{1, 462}_0 ∨ false 
c  in DIMACS:
-2546  2547  2548  0

c  3 does not represent an automaton state.
c    -(-b^{1, 462}_2 ∧  b^{1, 462}_1 ∧  b^{1, 462}_0 ∧ true) 
c  in CNF:
c     b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ false 
c  in DIMACS:
 2546 -2547 -2548  0
c  -3 does not represent an automaton state.
c    -( b^{1, 462}_2 ∧  b^{1, 462}_1 ∧  b^{1, 462}_0 ∧ true) 
c  in CNF:
c    -b^{1, 462}_2 ∨ -b^{1, 462}_1 ∨ -b^{1, 462}_0 ∨ false 
c  in DIMACS:
-2546 -2547 -2548  0

c i = 463
c  -2+1 --> -1
c    ( b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧  p_463) -> ( b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0)
c  in CNF:
c    -b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨  b^{1, 464}_2
c    -b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_1
c    -b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨  b^{1, 464}_0
c  in DIMACS:
-2549 -2550  2551 -463  2552 0
-2549 -2550  2551 -463 -2553 0
-2549 -2550  2551 -463  2554 0

c  -1+1 --> 0
c    ( b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0 ∧  p_463) -> (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧ -b^{1, 464}_0)
c  in CNF:
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_2
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_1
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_0
c  in DIMACS:
-2549  2550 -2551 -463 -2552 0
-2549  2550 -2551 -463 -2553 0
-2549  2550 -2551 -463 -2554 0

c  0+1 --> 1
c    (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧  p_463) -> (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0)
c  in CNF:
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_2
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_1
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨  b^{1, 464}_0
c  in DIMACS:
 2549  2550  2551 -463 -2552 0
 2549  2550  2551 -463 -2553 0
 2549  2550  2551 -463  2554 0

c  1+1 --> 2
c    (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0 ∧  p_463) -> (-b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0)
c  in CNF:
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_2
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨  b^{1, 464}_1
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ -p_463 ∨ -b^{1, 464}_0
c  in DIMACS:
 2549  2550 -2551 -463 -2552 0
 2549  2550 -2551 -463  2553 0
 2549  2550 -2551 -463 -2554 0

c  2+1 --> break 
c    (-b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧  p_463) -> break
c  in CNF:
c     b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ -p_463 ∨ break
c  in DIMACS:
 2549 -2550  2551 -463 1162 0


c  2-1 --> 1
c    (-b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧ -p_463) -> (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0)
c  in CNF:
c     b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_2
c     b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_1
c     b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨  b^{1, 464}_0
c  in DIMACS:
 2549 -2550  2551  463 -2552 0
 2549 -2550  2551  463 -2553 0
 2549 -2550  2551  463  2554 0

c  1-1 --> 0
c    (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0 ∧ -p_463) -> (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧ -b^{1, 464}_0)
c  in CNF:
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_2
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_1
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_0
c  in DIMACS:
 2549  2550 -2551  463 -2552 0
 2549  2550 -2551  463 -2553 0
 2549  2550 -2551  463 -2554 0

c  0-1 --> -1
c    (-b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧ -p_463) -> ( b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0)
c  in CNF:
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨  b^{1, 464}_2
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_1
c     b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨  b^{1, 464}_0
c  in DIMACS:
 2549  2550  2551  463  2552 0
 2549  2550  2551  463 -2553 0
 2549  2550  2551  463  2554 0

c  -1-1 --> -2
c    ( b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧  b^{1, 463}_0 ∧ -p_463) -> ( b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0)
c  in CNF:
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨  b^{1, 464}_2
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨  b^{1, 464}_1
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨  p_463 ∨ -b^{1, 464}_0
c  in DIMACS:
-2549  2550 -2551  463  2552 0
-2549  2550 -2551  463  2553 0
-2549  2550 -2551  463 -2554 0

c  -2-1 --> break 
c    ( b^{1, 463}_2 ∧  b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧ -p_463) -> break
c  in CNF:
c    -b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨  b^{1, 463}_0 ∨  p_463 ∨ break
c  in DIMACS:
-2549 -2550  2551  463 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 463}_2 ∧ -b^{1, 463}_1 ∧ -b^{1, 463}_0 ∧ true) 
c  in CNF:
c    -b^{1, 463}_2 ∨  b^{1, 463}_1 ∨  b^{1, 463}_0 ∨ false 
c  in DIMACS:
-2549  2550  2551  0

c  3 does not represent an automaton state.
c    -(-b^{1, 463}_2 ∧  b^{1, 463}_1 ∧  b^{1, 463}_0 ∧ true) 
c  in CNF:
c     b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ false 
c  in DIMACS:
 2549 -2550 -2551  0
c  -3 does not represent an automaton state.
c    -( b^{1, 463}_2 ∧  b^{1, 463}_1 ∧  b^{1, 463}_0 ∧ true) 
c  in CNF:
c    -b^{1, 463}_2 ∨ -b^{1, 463}_1 ∨ -b^{1, 463}_0 ∨ false 
c  in DIMACS:
-2549 -2550 -2551  0

c i = 464
c  -2+1 --> -1
c    ( b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧  p_464) -> ( b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0)
c  in CNF:
c    -b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨  b^{1, 465}_2
c    -b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_1
c    -b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨  b^{1, 465}_0
c  in DIMACS:
-2552 -2553  2554 -464  2555 0
-2552 -2553  2554 -464 -2556 0
-2552 -2553  2554 -464  2557 0

c  -1+1 --> 0
c    ( b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0 ∧  p_464) -> (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧ -b^{1, 465}_0)
c  in CNF:
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_2
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_1
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_0
c  in DIMACS:
-2552  2553 -2554 -464 -2555 0
-2552  2553 -2554 -464 -2556 0
-2552  2553 -2554 -464 -2557 0

c  0+1 --> 1
c    (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧  p_464) -> (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0)
c  in CNF:
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_2
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_1
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨  b^{1, 465}_0
c  in DIMACS:
 2552  2553  2554 -464 -2555 0
 2552  2553  2554 -464 -2556 0
 2552  2553  2554 -464  2557 0

c  1+1 --> 2
c    (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0 ∧  p_464) -> (-b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0)
c  in CNF:
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_2
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨  b^{1, 465}_1
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ -p_464 ∨ -b^{1, 465}_0
c  in DIMACS:
 2552  2553 -2554 -464 -2555 0
 2552  2553 -2554 -464  2556 0
 2552  2553 -2554 -464 -2557 0

c  2+1 --> break 
c    (-b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧  p_464) -> break
c  in CNF:
c     b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 2552 -2553  2554 -464 1162 0


c  2-1 --> 1
c    (-b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧ -p_464) -> (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0)
c  in CNF:
c     b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_2
c     b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_1
c     b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨  b^{1, 465}_0
c  in DIMACS:
 2552 -2553  2554  464 -2555 0
 2552 -2553  2554  464 -2556 0
 2552 -2553  2554  464  2557 0

c  1-1 --> 0
c    (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0 ∧ -p_464) -> (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧ -b^{1, 465}_0)
c  in CNF:
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_2
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_1
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_0
c  in DIMACS:
 2552  2553 -2554  464 -2555 0
 2552  2553 -2554  464 -2556 0
 2552  2553 -2554  464 -2557 0

c  0-1 --> -1
c    (-b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧ -p_464) -> ( b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0)
c  in CNF:
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨  b^{1, 465}_2
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_1
c     b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨  b^{1, 465}_0
c  in DIMACS:
 2552  2553  2554  464  2555 0
 2552  2553  2554  464 -2556 0
 2552  2553  2554  464  2557 0

c  -1-1 --> -2
c    ( b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧  b^{1, 464}_0 ∧ -p_464) -> ( b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0)
c  in CNF:
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨  b^{1, 465}_2
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨  b^{1, 465}_1
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨  p_464 ∨ -b^{1, 465}_0
c  in DIMACS:
-2552  2553 -2554  464  2555 0
-2552  2553 -2554  464  2556 0
-2552  2553 -2554  464 -2557 0

c  -2-1 --> break 
c    ( b^{1, 464}_2 ∧  b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨  b^{1, 464}_0 ∨  p_464 ∨ break
c  in DIMACS:
-2552 -2553  2554  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 464}_2 ∧ -b^{1, 464}_1 ∧ -b^{1, 464}_0 ∧ true) 
c  in CNF:
c    -b^{1, 464}_2 ∨  b^{1, 464}_1 ∨  b^{1, 464}_0 ∨ false 
c  in DIMACS:
-2552  2553  2554  0

c  3 does not represent an automaton state.
c    -(-b^{1, 464}_2 ∧  b^{1, 464}_1 ∧  b^{1, 464}_0 ∧ true) 
c  in CNF:
c     b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ false 
c  in DIMACS:
 2552 -2553 -2554  0
c  -3 does not represent an automaton state.
c    -( b^{1, 464}_2 ∧  b^{1, 464}_1 ∧  b^{1, 464}_0 ∧ true) 
c  in CNF:
c    -b^{1, 464}_2 ∨ -b^{1, 464}_1 ∨ -b^{1, 464}_0 ∨ false 
c  in DIMACS:
-2552 -2553 -2554  0

c i = 465
c  -2+1 --> -1
c    ( b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧  p_465) -> ( b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0)
c  in CNF:
c    -b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨  b^{1, 466}_2
c    -b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_1
c    -b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨  b^{1, 466}_0
c  in DIMACS:
-2555 -2556  2557 -465  2558 0
-2555 -2556  2557 -465 -2559 0
-2555 -2556  2557 -465  2560 0

c  -1+1 --> 0
c    ( b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0 ∧  p_465) -> (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧ -b^{1, 466}_0)
c  in CNF:
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_2
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_1
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_0
c  in DIMACS:
-2555  2556 -2557 -465 -2558 0
-2555  2556 -2557 -465 -2559 0
-2555  2556 -2557 -465 -2560 0

c  0+1 --> 1
c    (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧  p_465) -> (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0)
c  in CNF:
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_2
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_1
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨  b^{1, 466}_0
c  in DIMACS:
 2555  2556  2557 -465 -2558 0
 2555  2556  2557 -465 -2559 0
 2555  2556  2557 -465  2560 0

c  1+1 --> 2
c    (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0 ∧  p_465) -> (-b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0)
c  in CNF:
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_2
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨  b^{1, 466}_1
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ -p_465 ∨ -b^{1, 466}_0
c  in DIMACS:
 2555  2556 -2557 -465 -2558 0
 2555  2556 -2557 -465  2559 0
 2555  2556 -2557 -465 -2560 0

c  2+1 --> break 
c    (-b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧  p_465) -> break
c  in CNF:
c     b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 2555 -2556  2557 -465 1162 0


c  2-1 --> 1
c    (-b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧ -p_465) -> (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0)
c  in CNF:
c     b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_2
c     b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_1
c     b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨  b^{1, 466}_0
c  in DIMACS:
 2555 -2556  2557  465 -2558 0
 2555 -2556  2557  465 -2559 0
 2555 -2556  2557  465  2560 0

c  1-1 --> 0
c    (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0 ∧ -p_465) -> (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧ -b^{1, 466}_0)
c  in CNF:
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_2
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_1
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_0
c  in DIMACS:
 2555  2556 -2557  465 -2558 0
 2555  2556 -2557  465 -2559 0
 2555  2556 -2557  465 -2560 0

c  0-1 --> -1
c    (-b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧ -p_465) -> ( b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0)
c  in CNF:
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨  b^{1, 466}_2
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_1
c     b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨  b^{1, 466}_0
c  in DIMACS:
 2555  2556  2557  465  2558 0
 2555  2556  2557  465 -2559 0
 2555  2556  2557  465  2560 0

c  -1-1 --> -2
c    ( b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧  b^{1, 465}_0 ∧ -p_465) -> ( b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0)
c  in CNF:
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨  b^{1, 466}_2
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨  b^{1, 466}_1
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨  p_465 ∨ -b^{1, 466}_0
c  in DIMACS:
-2555  2556 -2557  465  2558 0
-2555  2556 -2557  465  2559 0
-2555  2556 -2557  465 -2560 0

c  -2-1 --> break 
c    ( b^{1, 465}_2 ∧  b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨  b^{1, 465}_0 ∨  p_465 ∨ break
c  in DIMACS:
-2555 -2556  2557  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 465}_2 ∧ -b^{1, 465}_1 ∧ -b^{1, 465}_0 ∧ true) 
c  in CNF:
c    -b^{1, 465}_2 ∨  b^{1, 465}_1 ∨  b^{1, 465}_0 ∨ false 
c  in DIMACS:
-2555  2556  2557  0

c  3 does not represent an automaton state.
c    -(-b^{1, 465}_2 ∧  b^{1, 465}_1 ∧  b^{1, 465}_0 ∧ true) 
c  in CNF:
c     b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ false 
c  in DIMACS:
 2555 -2556 -2557  0
c  -3 does not represent an automaton state.
c    -( b^{1, 465}_2 ∧  b^{1, 465}_1 ∧  b^{1, 465}_0 ∧ true) 
c  in CNF:
c    -b^{1, 465}_2 ∨ -b^{1, 465}_1 ∨ -b^{1, 465}_0 ∨ false 
c  in DIMACS:
-2555 -2556 -2557  0

c i = 466
c  -2+1 --> -1
c    ( b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧  p_466) -> ( b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0)
c  in CNF:
c    -b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨  b^{1, 467}_2
c    -b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_1
c    -b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨  b^{1, 467}_0
c  in DIMACS:
-2558 -2559  2560 -466  2561 0
-2558 -2559  2560 -466 -2562 0
-2558 -2559  2560 -466  2563 0

c  -1+1 --> 0
c    ( b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0 ∧  p_466) -> (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧ -b^{1, 467}_0)
c  in CNF:
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_2
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_1
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_0
c  in DIMACS:
-2558  2559 -2560 -466 -2561 0
-2558  2559 -2560 -466 -2562 0
-2558  2559 -2560 -466 -2563 0

c  0+1 --> 1
c    (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧  p_466) -> (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0)
c  in CNF:
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_2
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_1
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨  b^{1, 467}_0
c  in DIMACS:
 2558  2559  2560 -466 -2561 0
 2558  2559  2560 -466 -2562 0
 2558  2559  2560 -466  2563 0

c  1+1 --> 2
c    (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0 ∧  p_466) -> (-b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0)
c  in CNF:
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_2
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨  b^{1, 467}_1
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ -p_466 ∨ -b^{1, 467}_0
c  in DIMACS:
 2558  2559 -2560 -466 -2561 0
 2558  2559 -2560 -466  2562 0
 2558  2559 -2560 -466 -2563 0

c  2+1 --> break 
c    (-b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧  p_466) -> break
c  in CNF:
c     b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ -p_466 ∨ break
c  in DIMACS:
 2558 -2559  2560 -466 1162 0


c  2-1 --> 1
c    (-b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧ -p_466) -> (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0)
c  in CNF:
c     b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_2
c     b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_1
c     b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨  b^{1, 467}_0
c  in DIMACS:
 2558 -2559  2560  466 -2561 0
 2558 -2559  2560  466 -2562 0
 2558 -2559  2560  466  2563 0

c  1-1 --> 0
c    (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0 ∧ -p_466) -> (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧ -b^{1, 467}_0)
c  in CNF:
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_2
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_1
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_0
c  in DIMACS:
 2558  2559 -2560  466 -2561 0
 2558  2559 -2560  466 -2562 0
 2558  2559 -2560  466 -2563 0

c  0-1 --> -1
c    (-b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧ -p_466) -> ( b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0)
c  in CNF:
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨  b^{1, 467}_2
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_1
c     b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨  b^{1, 467}_0
c  in DIMACS:
 2558  2559  2560  466  2561 0
 2558  2559  2560  466 -2562 0
 2558  2559  2560  466  2563 0

c  -1-1 --> -2
c    ( b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧  b^{1, 466}_0 ∧ -p_466) -> ( b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0)
c  in CNF:
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨  b^{1, 467}_2
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨  b^{1, 467}_1
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨  p_466 ∨ -b^{1, 467}_0
c  in DIMACS:
-2558  2559 -2560  466  2561 0
-2558  2559 -2560  466  2562 0
-2558  2559 -2560  466 -2563 0

c  -2-1 --> break 
c    ( b^{1, 466}_2 ∧  b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧ -p_466) -> break
c  in CNF:
c    -b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨  b^{1, 466}_0 ∨  p_466 ∨ break
c  in DIMACS:
-2558 -2559  2560  466 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 466}_2 ∧ -b^{1, 466}_1 ∧ -b^{1, 466}_0 ∧ true) 
c  in CNF:
c    -b^{1, 466}_2 ∨  b^{1, 466}_1 ∨  b^{1, 466}_0 ∨ false 
c  in DIMACS:
-2558  2559  2560  0

c  3 does not represent an automaton state.
c    -(-b^{1, 466}_2 ∧  b^{1, 466}_1 ∧  b^{1, 466}_0 ∧ true) 
c  in CNF:
c     b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ false 
c  in DIMACS:
 2558 -2559 -2560  0
c  -3 does not represent an automaton state.
c    -( b^{1, 466}_2 ∧  b^{1, 466}_1 ∧  b^{1, 466}_0 ∧ true) 
c  in CNF:
c    -b^{1, 466}_2 ∨ -b^{1, 466}_1 ∨ -b^{1, 466}_0 ∨ false 
c  in DIMACS:
-2558 -2559 -2560  0

c i = 467
c  -2+1 --> -1
c    ( b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧  p_467) -> ( b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0)
c  in CNF:
c    -b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨  b^{1, 468}_2
c    -b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_1
c    -b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨  b^{1, 468}_0
c  in DIMACS:
-2561 -2562  2563 -467  2564 0
-2561 -2562  2563 -467 -2565 0
-2561 -2562  2563 -467  2566 0

c  -1+1 --> 0
c    ( b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0 ∧  p_467) -> (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧ -b^{1, 468}_0)
c  in CNF:
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_2
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_1
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_0
c  in DIMACS:
-2561  2562 -2563 -467 -2564 0
-2561  2562 -2563 -467 -2565 0
-2561  2562 -2563 -467 -2566 0

c  0+1 --> 1
c    (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧  p_467) -> (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0)
c  in CNF:
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_2
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_1
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨  b^{1, 468}_0
c  in DIMACS:
 2561  2562  2563 -467 -2564 0
 2561  2562  2563 -467 -2565 0
 2561  2562  2563 -467  2566 0

c  1+1 --> 2
c    (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0 ∧  p_467) -> (-b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0)
c  in CNF:
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_2
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨  b^{1, 468}_1
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ -p_467 ∨ -b^{1, 468}_0
c  in DIMACS:
 2561  2562 -2563 -467 -2564 0
 2561  2562 -2563 -467  2565 0
 2561  2562 -2563 -467 -2566 0

c  2+1 --> break 
c    (-b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧  p_467) -> break
c  in CNF:
c     b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ -p_467 ∨ break
c  in DIMACS:
 2561 -2562  2563 -467 1162 0


c  2-1 --> 1
c    (-b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧ -p_467) -> (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0)
c  in CNF:
c     b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_2
c     b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_1
c     b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨  b^{1, 468}_0
c  in DIMACS:
 2561 -2562  2563  467 -2564 0
 2561 -2562  2563  467 -2565 0
 2561 -2562  2563  467  2566 0

c  1-1 --> 0
c    (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0 ∧ -p_467) -> (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧ -b^{1, 468}_0)
c  in CNF:
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_2
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_1
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_0
c  in DIMACS:
 2561  2562 -2563  467 -2564 0
 2561  2562 -2563  467 -2565 0
 2561  2562 -2563  467 -2566 0

c  0-1 --> -1
c    (-b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧ -p_467) -> ( b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0)
c  in CNF:
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨  b^{1, 468}_2
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_1
c     b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨  b^{1, 468}_0
c  in DIMACS:
 2561  2562  2563  467  2564 0
 2561  2562  2563  467 -2565 0
 2561  2562  2563  467  2566 0

c  -1-1 --> -2
c    ( b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧  b^{1, 467}_0 ∧ -p_467) -> ( b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0)
c  in CNF:
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨  b^{1, 468}_2
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨  b^{1, 468}_1
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨  p_467 ∨ -b^{1, 468}_0
c  in DIMACS:
-2561  2562 -2563  467  2564 0
-2561  2562 -2563  467  2565 0
-2561  2562 -2563  467 -2566 0

c  -2-1 --> break 
c    ( b^{1, 467}_2 ∧  b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧ -p_467) -> break
c  in CNF:
c    -b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨  b^{1, 467}_0 ∨  p_467 ∨ break
c  in DIMACS:
-2561 -2562  2563  467 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 467}_2 ∧ -b^{1, 467}_1 ∧ -b^{1, 467}_0 ∧ true) 
c  in CNF:
c    -b^{1, 467}_2 ∨  b^{1, 467}_1 ∨  b^{1, 467}_0 ∨ false 
c  in DIMACS:
-2561  2562  2563  0

c  3 does not represent an automaton state.
c    -(-b^{1, 467}_2 ∧  b^{1, 467}_1 ∧  b^{1, 467}_0 ∧ true) 
c  in CNF:
c     b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ false 
c  in DIMACS:
 2561 -2562 -2563  0
c  -3 does not represent an automaton state.
c    -( b^{1, 467}_2 ∧  b^{1, 467}_1 ∧  b^{1, 467}_0 ∧ true) 
c  in CNF:
c    -b^{1, 467}_2 ∨ -b^{1, 467}_1 ∨ -b^{1, 467}_0 ∨ false 
c  in DIMACS:
-2561 -2562 -2563  0

c i = 468
c  -2+1 --> -1
c    ( b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧  p_468) -> ( b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0)
c  in CNF:
c    -b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨  b^{1, 469}_2
c    -b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_1
c    -b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨  b^{1, 469}_0
c  in DIMACS:
-2564 -2565  2566 -468  2567 0
-2564 -2565  2566 -468 -2568 0
-2564 -2565  2566 -468  2569 0

c  -1+1 --> 0
c    ( b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0 ∧  p_468) -> (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧ -b^{1, 469}_0)
c  in CNF:
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_2
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_1
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_0
c  in DIMACS:
-2564  2565 -2566 -468 -2567 0
-2564  2565 -2566 -468 -2568 0
-2564  2565 -2566 -468 -2569 0

c  0+1 --> 1
c    (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧  p_468) -> (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0)
c  in CNF:
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_2
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_1
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨  b^{1, 469}_0
c  in DIMACS:
 2564  2565  2566 -468 -2567 0
 2564  2565  2566 -468 -2568 0
 2564  2565  2566 -468  2569 0

c  1+1 --> 2
c    (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0 ∧  p_468) -> (-b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0)
c  in CNF:
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_2
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨  b^{1, 469}_1
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ -p_468 ∨ -b^{1, 469}_0
c  in DIMACS:
 2564  2565 -2566 -468 -2567 0
 2564  2565 -2566 -468  2568 0
 2564  2565 -2566 -468 -2569 0

c  2+1 --> break 
c    (-b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧  p_468) -> break
c  in CNF:
c     b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 2564 -2565  2566 -468 1162 0


c  2-1 --> 1
c    (-b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧ -p_468) -> (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0)
c  in CNF:
c     b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_2
c     b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_1
c     b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨  b^{1, 469}_0
c  in DIMACS:
 2564 -2565  2566  468 -2567 0
 2564 -2565  2566  468 -2568 0
 2564 -2565  2566  468  2569 0

c  1-1 --> 0
c    (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0 ∧ -p_468) -> (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧ -b^{1, 469}_0)
c  in CNF:
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_2
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_1
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_0
c  in DIMACS:
 2564  2565 -2566  468 -2567 0
 2564  2565 -2566  468 -2568 0
 2564  2565 -2566  468 -2569 0

c  0-1 --> -1
c    (-b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧ -p_468) -> ( b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0)
c  in CNF:
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨  b^{1, 469}_2
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_1
c     b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨  b^{1, 469}_0
c  in DIMACS:
 2564  2565  2566  468  2567 0
 2564  2565  2566  468 -2568 0
 2564  2565  2566  468  2569 0

c  -1-1 --> -2
c    ( b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧  b^{1, 468}_0 ∧ -p_468) -> ( b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0)
c  in CNF:
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨  b^{1, 469}_2
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨  b^{1, 469}_1
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨  p_468 ∨ -b^{1, 469}_0
c  in DIMACS:
-2564  2565 -2566  468  2567 0
-2564  2565 -2566  468  2568 0
-2564  2565 -2566  468 -2569 0

c  -2-1 --> break 
c    ( b^{1, 468}_2 ∧  b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨  b^{1, 468}_0 ∨  p_468 ∨ break
c  in DIMACS:
-2564 -2565  2566  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 468}_2 ∧ -b^{1, 468}_1 ∧ -b^{1, 468}_0 ∧ true) 
c  in CNF:
c    -b^{1, 468}_2 ∨  b^{1, 468}_1 ∨  b^{1, 468}_0 ∨ false 
c  in DIMACS:
-2564  2565  2566  0

c  3 does not represent an automaton state.
c    -(-b^{1, 468}_2 ∧  b^{1, 468}_1 ∧  b^{1, 468}_0 ∧ true) 
c  in CNF:
c     b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ false 
c  in DIMACS:
 2564 -2565 -2566  0
c  -3 does not represent an automaton state.
c    -( b^{1, 468}_2 ∧  b^{1, 468}_1 ∧  b^{1, 468}_0 ∧ true) 
c  in CNF:
c    -b^{1, 468}_2 ∨ -b^{1, 468}_1 ∨ -b^{1, 468}_0 ∨ false 
c  in DIMACS:
-2564 -2565 -2566  0

c i = 469
c  -2+1 --> -1
c    ( b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧  p_469) -> ( b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0)
c  in CNF:
c    -b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨  b^{1, 470}_2
c    -b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_1
c    -b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨  b^{1, 470}_0
c  in DIMACS:
-2567 -2568  2569 -469  2570 0
-2567 -2568  2569 -469 -2571 0
-2567 -2568  2569 -469  2572 0

c  -1+1 --> 0
c    ( b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0 ∧  p_469) -> (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧ -b^{1, 470}_0)
c  in CNF:
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_2
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_1
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_0
c  in DIMACS:
-2567  2568 -2569 -469 -2570 0
-2567  2568 -2569 -469 -2571 0
-2567  2568 -2569 -469 -2572 0

c  0+1 --> 1
c    (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧  p_469) -> (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0)
c  in CNF:
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_2
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_1
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨  b^{1, 470}_0
c  in DIMACS:
 2567  2568  2569 -469 -2570 0
 2567  2568  2569 -469 -2571 0
 2567  2568  2569 -469  2572 0

c  1+1 --> 2
c    (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0 ∧  p_469) -> (-b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0)
c  in CNF:
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_2
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨  b^{1, 470}_1
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ -p_469 ∨ -b^{1, 470}_0
c  in DIMACS:
 2567  2568 -2569 -469 -2570 0
 2567  2568 -2569 -469  2571 0
 2567  2568 -2569 -469 -2572 0

c  2+1 --> break 
c    (-b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧  p_469) -> break
c  in CNF:
c     b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ -p_469 ∨ break
c  in DIMACS:
 2567 -2568  2569 -469 1162 0


c  2-1 --> 1
c    (-b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧ -p_469) -> (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0)
c  in CNF:
c     b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_2
c     b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_1
c     b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨  b^{1, 470}_0
c  in DIMACS:
 2567 -2568  2569  469 -2570 0
 2567 -2568  2569  469 -2571 0
 2567 -2568  2569  469  2572 0

c  1-1 --> 0
c    (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0 ∧ -p_469) -> (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧ -b^{1, 470}_0)
c  in CNF:
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_2
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_1
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_0
c  in DIMACS:
 2567  2568 -2569  469 -2570 0
 2567  2568 -2569  469 -2571 0
 2567  2568 -2569  469 -2572 0

c  0-1 --> -1
c    (-b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧ -p_469) -> ( b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0)
c  in CNF:
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨  b^{1, 470}_2
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_1
c     b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨  b^{1, 470}_0
c  in DIMACS:
 2567  2568  2569  469  2570 0
 2567  2568  2569  469 -2571 0
 2567  2568  2569  469  2572 0

c  -1-1 --> -2
c    ( b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧  b^{1, 469}_0 ∧ -p_469) -> ( b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0)
c  in CNF:
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨  b^{1, 470}_2
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨  b^{1, 470}_1
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨  p_469 ∨ -b^{1, 470}_0
c  in DIMACS:
-2567  2568 -2569  469  2570 0
-2567  2568 -2569  469  2571 0
-2567  2568 -2569  469 -2572 0

c  -2-1 --> break 
c    ( b^{1, 469}_2 ∧  b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧ -p_469) -> break
c  in CNF:
c    -b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨  b^{1, 469}_0 ∨  p_469 ∨ break
c  in DIMACS:
-2567 -2568  2569  469 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 469}_2 ∧ -b^{1, 469}_1 ∧ -b^{1, 469}_0 ∧ true) 
c  in CNF:
c    -b^{1, 469}_2 ∨  b^{1, 469}_1 ∨  b^{1, 469}_0 ∨ false 
c  in DIMACS:
-2567  2568  2569  0

c  3 does not represent an automaton state.
c    -(-b^{1, 469}_2 ∧  b^{1, 469}_1 ∧  b^{1, 469}_0 ∧ true) 
c  in CNF:
c     b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ false 
c  in DIMACS:
 2567 -2568 -2569  0
c  -3 does not represent an automaton state.
c    -( b^{1, 469}_2 ∧  b^{1, 469}_1 ∧  b^{1, 469}_0 ∧ true) 
c  in CNF:
c    -b^{1, 469}_2 ∨ -b^{1, 469}_1 ∨ -b^{1, 469}_0 ∨ false 
c  in DIMACS:
-2567 -2568 -2569  0

c i = 470
c  -2+1 --> -1
c    ( b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧  p_470) -> ( b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0)
c  in CNF:
c    -b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨  b^{1, 471}_2
c    -b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_1
c    -b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨  b^{1, 471}_0
c  in DIMACS:
-2570 -2571  2572 -470  2573 0
-2570 -2571  2572 -470 -2574 0
-2570 -2571  2572 -470  2575 0

c  -1+1 --> 0
c    ( b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0 ∧  p_470) -> (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧ -b^{1, 471}_0)
c  in CNF:
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_2
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_1
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_0
c  in DIMACS:
-2570  2571 -2572 -470 -2573 0
-2570  2571 -2572 -470 -2574 0
-2570  2571 -2572 -470 -2575 0

c  0+1 --> 1
c    (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧  p_470) -> (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0)
c  in CNF:
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_2
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_1
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨  b^{1, 471}_0
c  in DIMACS:
 2570  2571  2572 -470 -2573 0
 2570  2571  2572 -470 -2574 0
 2570  2571  2572 -470  2575 0

c  1+1 --> 2
c    (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0 ∧  p_470) -> (-b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0)
c  in CNF:
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_2
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨  b^{1, 471}_1
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ -p_470 ∨ -b^{1, 471}_0
c  in DIMACS:
 2570  2571 -2572 -470 -2573 0
 2570  2571 -2572 -470  2574 0
 2570  2571 -2572 -470 -2575 0

c  2+1 --> break 
c    (-b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧  p_470) -> break
c  in CNF:
c     b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 2570 -2571  2572 -470 1162 0


c  2-1 --> 1
c    (-b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧ -p_470) -> (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0)
c  in CNF:
c     b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_2
c     b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_1
c     b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨  b^{1, 471}_0
c  in DIMACS:
 2570 -2571  2572  470 -2573 0
 2570 -2571  2572  470 -2574 0
 2570 -2571  2572  470  2575 0

c  1-1 --> 0
c    (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0 ∧ -p_470) -> (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧ -b^{1, 471}_0)
c  in CNF:
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_2
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_1
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_0
c  in DIMACS:
 2570  2571 -2572  470 -2573 0
 2570  2571 -2572  470 -2574 0
 2570  2571 -2572  470 -2575 0

c  0-1 --> -1
c    (-b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧ -p_470) -> ( b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0)
c  in CNF:
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨  b^{1, 471}_2
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_1
c     b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨  b^{1, 471}_0
c  in DIMACS:
 2570  2571  2572  470  2573 0
 2570  2571  2572  470 -2574 0
 2570  2571  2572  470  2575 0

c  -1-1 --> -2
c    ( b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧  b^{1, 470}_0 ∧ -p_470) -> ( b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0)
c  in CNF:
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨  b^{1, 471}_2
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨  b^{1, 471}_1
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨  p_470 ∨ -b^{1, 471}_0
c  in DIMACS:
-2570  2571 -2572  470  2573 0
-2570  2571 -2572  470  2574 0
-2570  2571 -2572  470 -2575 0

c  -2-1 --> break 
c    ( b^{1, 470}_2 ∧  b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨  b^{1, 470}_0 ∨  p_470 ∨ break
c  in DIMACS:
-2570 -2571  2572  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 470}_2 ∧ -b^{1, 470}_1 ∧ -b^{1, 470}_0 ∧ true) 
c  in CNF:
c    -b^{1, 470}_2 ∨  b^{1, 470}_1 ∨  b^{1, 470}_0 ∨ false 
c  in DIMACS:
-2570  2571  2572  0

c  3 does not represent an automaton state.
c    -(-b^{1, 470}_2 ∧  b^{1, 470}_1 ∧  b^{1, 470}_0 ∧ true) 
c  in CNF:
c     b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ false 
c  in DIMACS:
 2570 -2571 -2572  0
c  -3 does not represent an automaton state.
c    -( b^{1, 470}_2 ∧  b^{1, 470}_1 ∧  b^{1, 470}_0 ∧ true) 
c  in CNF:
c    -b^{1, 470}_2 ∨ -b^{1, 470}_1 ∨ -b^{1, 470}_0 ∨ false 
c  in DIMACS:
-2570 -2571 -2572  0

c i = 471
c  -2+1 --> -1
c    ( b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧  p_471) -> ( b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0)
c  in CNF:
c    -b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨  b^{1, 472}_2
c    -b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_1
c    -b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨  b^{1, 472}_0
c  in DIMACS:
-2573 -2574  2575 -471  2576 0
-2573 -2574  2575 -471 -2577 0
-2573 -2574  2575 -471  2578 0

c  -1+1 --> 0
c    ( b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0 ∧  p_471) -> (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧ -b^{1, 472}_0)
c  in CNF:
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_2
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_1
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_0
c  in DIMACS:
-2573  2574 -2575 -471 -2576 0
-2573  2574 -2575 -471 -2577 0
-2573  2574 -2575 -471 -2578 0

c  0+1 --> 1
c    (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧  p_471) -> (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0)
c  in CNF:
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_2
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_1
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨  b^{1, 472}_0
c  in DIMACS:
 2573  2574  2575 -471 -2576 0
 2573  2574  2575 -471 -2577 0
 2573  2574  2575 -471  2578 0

c  1+1 --> 2
c    (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0 ∧  p_471) -> (-b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0)
c  in CNF:
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_2
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨  b^{1, 472}_1
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ -p_471 ∨ -b^{1, 472}_0
c  in DIMACS:
 2573  2574 -2575 -471 -2576 0
 2573  2574 -2575 -471  2577 0
 2573  2574 -2575 -471 -2578 0

c  2+1 --> break 
c    (-b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧  p_471) -> break
c  in CNF:
c     b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ -p_471 ∨ break
c  in DIMACS:
 2573 -2574  2575 -471 1162 0


c  2-1 --> 1
c    (-b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧ -p_471) -> (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0)
c  in CNF:
c     b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_2
c     b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_1
c     b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨  b^{1, 472}_0
c  in DIMACS:
 2573 -2574  2575  471 -2576 0
 2573 -2574  2575  471 -2577 0
 2573 -2574  2575  471  2578 0

c  1-1 --> 0
c    (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0 ∧ -p_471) -> (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧ -b^{1, 472}_0)
c  in CNF:
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_2
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_1
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_0
c  in DIMACS:
 2573  2574 -2575  471 -2576 0
 2573  2574 -2575  471 -2577 0
 2573  2574 -2575  471 -2578 0

c  0-1 --> -1
c    (-b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧ -p_471) -> ( b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0)
c  in CNF:
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨  b^{1, 472}_2
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_1
c     b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨  b^{1, 472}_0
c  in DIMACS:
 2573  2574  2575  471  2576 0
 2573  2574  2575  471 -2577 0
 2573  2574  2575  471  2578 0

c  -1-1 --> -2
c    ( b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧  b^{1, 471}_0 ∧ -p_471) -> ( b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0)
c  in CNF:
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨  b^{1, 472}_2
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨  b^{1, 472}_1
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨  p_471 ∨ -b^{1, 472}_0
c  in DIMACS:
-2573  2574 -2575  471  2576 0
-2573  2574 -2575  471  2577 0
-2573  2574 -2575  471 -2578 0

c  -2-1 --> break 
c    ( b^{1, 471}_2 ∧  b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧ -p_471) -> break
c  in CNF:
c    -b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨  b^{1, 471}_0 ∨  p_471 ∨ break
c  in DIMACS:
-2573 -2574  2575  471 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 471}_2 ∧ -b^{1, 471}_1 ∧ -b^{1, 471}_0 ∧ true) 
c  in CNF:
c    -b^{1, 471}_2 ∨  b^{1, 471}_1 ∨  b^{1, 471}_0 ∨ false 
c  in DIMACS:
-2573  2574  2575  0

c  3 does not represent an automaton state.
c    -(-b^{1, 471}_2 ∧  b^{1, 471}_1 ∧  b^{1, 471}_0 ∧ true) 
c  in CNF:
c     b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ false 
c  in DIMACS:
 2573 -2574 -2575  0
c  -3 does not represent an automaton state.
c    -( b^{1, 471}_2 ∧  b^{1, 471}_1 ∧  b^{1, 471}_0 ∧ true) 
c  in CNF:
c    -b^{1, 471}_2 ∨ -b^{1, 471}_1 ∨ -b^{1, 471}_0 ∨ false 
c  in DIMACS:
-2573 -2574 -2575  0

c i = 472
c  -2+1 --> -1
c    ( b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧  p_472) -> ( b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0)
c  in CNF:
c    -b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨  b^{1, 473}_2
c    -b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_1
c    -b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨  b^{1, 473}_0
c  in DIMACS:
-2576 -2577  2578 -472  2579 0
-2576 -2577  2578 -472 -2580 0
-2576 -2577  2578 -472  2581 0

c  -1+1 --> 0
c    ( b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0 ∧  p_472) -> (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧ -b^{1, 473}_0)
c  in CNF:
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_2
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_1
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_0
c  in DIMACS:
-2576  2577 -2578 -472 -2579 0
-2576  2577 -2578 -472 -2580 0
-2576  2577 -2578 -472 -2581 0

c  0+1 --> 1
c    (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧  p_472) -> (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0)
c  in CNF:
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_2
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_1
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨  b^{1, 473}_0
c  in DIMACS:
 2576  2577  2578 -472 -2579 0
 2576  2577  2578 -472 -2580 0
 2576  2577  2578 -472  2581 0

c  1+1 --> 2
c    (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0 ∧  p_472) -> (-b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0)
c  in CNF:
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_2
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨  b^{1, 473}_1
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ -p_472 ∨ -b^{1, 473}_0
c  in DIMACS:
 2576  2577 -2578 -472 -2579 0
 2576  2577 -2578 -472  2580 0
 2576  2577 -2578 -472 -2581 0

c  2+1 --> break 
c    (-b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧  p_472) -> break
c  in CNF:
c     b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 2576 -2577  2578 -472 1162 0


c  2-1 --> 1
c    (-b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧ -p_472) -> (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0)
c  in CNF:
c     b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_2
c     b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_1
c     b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨  b^{1, 473}_0
c  in DIMACS:
 2576 -2577  2578  472 -2579 0
 2576 -2577  2578  472 -2580 0
 2576 -2577  2578  472  2581 0

c  1-1 --> 0
c    (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0 ∧ -p_472) -> (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧ -b^{1, 473}_0)
c  in CNF:
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_2
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_1
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_0
c  in DIMACS:
 2576  2577 -2578  472 -2579 0
 2576  2577 -2578  472 -2580 0
 2576  2577 -2578  472 -2581 0

c  0-1 --> -1
c    (-b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧ -p_472) -> ( b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0)
c  in CNF:
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨  b^{1, 473}_2
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_1
c     b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨  b^{1, 473}_0
c  in DIMACS:
 2576  2577  2578  472  2579 0
 2576  2577  2578  472 -2580 0
 2576  2577  2578  472  2581 0

c  -1-1 --> -2
c    ( b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧  b^{1, 472}_0 ∧ -p_472) -> ( b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0)
c  in CNF:
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨  b^{1, 473}_2
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨  b^{1, 473}_1
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨  p_472 ∨ -b^{1, 473}_0
c  in DIMACS:
-2576  2577 -2578  472  2579 0
-2576  2577 -2578  472  2580 0
-2576  2577 -2578  472 -2581 0

c  -2-1 --> break 
c    ( b^{1, 472}_2 ∧  b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨  b^{1, 472}_0 ∨  p_472 ∨ break
c  in DIMACS:
-2576 -2577  2578  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 472}_2 ∧ -b^{1, 472}_1 ∧ -b^{1, 472}_0 ∧ true) 
c  in CNF:
c    -b^{1, 472}_2 ∨  b^{1, 472}_1 ∨  b^{1, 472}_0 ∨ false 
c  in DIMACS:
-2576  2577  2578  0

c  3 does not represent an automaton state.
c    -(-b^{1, 472}_2 ∧  b^{1, 472}_1 ∧  b^{1, 472}_0 ∧ true) 
c  in CNF:
c     b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ false 
c  in DIMACS:
 2576 -2577 -2578  0
c  -3 does not represent an automaton state.
c    -( b^{1, 472}_2 ∧  b^{1, 472}_1 ∧  b^{1, 472}_0 ∧ true) 
c  in CNF:
c    -b^{1, 472}_2 ∨ -b^{1, 472}_1 ∨ -b^{1, 472}_0 ∨ false 
c  in DIMACS:
-2576 -2577 -2578  0

c i = 473
c  -2+1 --> -1
c    ( b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧  p_473) -> ( b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0)
c  in CNF:
c    -b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨  b^{1, 474}_2
c    -b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_1
c    -b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨  b^{1, 474}_0
c  in DIMACS:
-2579 -2580  2581 -473  2582 0
-2579 -2580  2581 -473 -2583 0
-2579 -2580  2581 -473  2584 0

c  -1+1 --> 0
c    ( b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0 ∧  p_473) -> (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧ -b^{1, 474}_0)
c  in CNF:
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_2
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_1
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_0
c  in DIMACS:
-2579  2580 -2581 -473 -2582 0
-2579  2580 -2581 -473 -2583 0
-2579  2580 -2581 -473 -2584 0

c  0+1 --> 1
c    (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧  p_473) -> (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0)
c  in CNF:
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_2
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_1
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨  b^{1, 474}_0
c  in DIMACS:
 2579  2580  2581 -473 -2582 0
 2579  2580  2581 -473 -2583 0
 2579  2580  2581 -473  2584 0

c  1+1 --> 2
c    (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0 ∧  p_473) -> (-b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0)
c  in CNF:
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_2
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨  b^{1, 474}_1
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ -p_473 ∨ -b^{1, 474}_0
c  in DIMACS:
 2579  2580 -2581 -473 -2582 0
 2579  2580 -2581 -473  2583 0
 2579  2580 -2581 -473 -2584 0

c  2+1 --> break 
c    (-b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧  p_473) -> break
c  in CNF:
c     b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ -p_473 ∨ break
c  in DIMACS:
 2579 -2580  2581 -473 1162 0


c  2-1 --> 1
c    (-b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧ -p_473) -> (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0)
c  in CNF:
c     b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_2
c     b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_1
c     b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨  b^{1, 474}_0
c  in DIMACS:
 2579 -2580  2581  473 -2582 0
 2579 -2580  2581  473 -2583 0
 2579 -2580  2581  473  2584 0

c  1-1 --> 0
c    (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0 ∧ -p_473) -> (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧ -b^{1, 474}_0)
c  in CNF:
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_2
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_1
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_0
c  in DIMACS:
 2579  2580 -2581  473 -2582 0
 2579  2580 -2581  473 -2583 0
 2579  2580 -2581  473 -2584 0

c  0-1 --> -1
c    (-b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧ -p_473) -> ( b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0)
c  in CNF:
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨  b^{1, 474}_2
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_1
c     b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨  b^{1, 474}_0
c  in DIMACS:
 2579  2580  2581  473  2582 0
 2579  2580  2581  473 -2583 0
 2579  2580  2581  473  2584 0

c  -1-1 --> -2
c    ( b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧  b^{1, 473}_0 ∧ -p_473) -> ( b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0)
c  in CNF:
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨  b^{1, 474}_2
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨  b^{1, 474}_1
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨  p_473 ∨ -b^{1, 474}_0
c  in DIMACS:
-2579  2580 -2581  473  2582 0
-2579  2580 -2581  473  2583 0
-2579  2580 -2581  473 -2584 0

c  -2-1 --> break 
c    ( b^{1, 473}_2 ∧  b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧ -p_473) -> break
c  in CNF:
c    -b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨  b^{1, 473}_0 ∨  p_473 ∨ break
c  in DIMACS:
-2579 -2580  2581  473 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 473}_2 ∧ -b^{1, 473}_1 ∧ -b^{1, 473}_0 ∧ true) 
c  in CNF:
c    -b^{1, 473}_2 ∨  b^{1, 473}_1 ∨  b^{1, 473}_0 ∨ false 
c  in DIMACS:
-2579  2580  2581  0

c  3 does not represent an automaton state.
c    -(-b^{1, 473}_2 ∧  b^{1, 473}_1 ∧  b^{1, 473}_0 ∧ true) 
c  in CNF:
c     b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ false 
c  in DIMACS:
 2579 -2580 -2581  0
c  -3 does not represent an automaton state.
c    -( b^{1, 473}_2 ∧  b^{1, 473}_1 ∧  b^{1, 473}_0 ∧ true) 
c  in CNF:
c    -b^{1, 473}_2 ∨ -b^{1, 473}_1 ∨ -b^{1, 473}_0 ∨ false 
c  in DIMACS:
-2579 -2580 -2581  0

c i = 474
c  -2+1 --> -1
c    ( b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧  p_474) -> ( b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0)
c  in CNF:
c    -b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨  b^{1, 475}_2
c    -b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_1
c    -b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨  b^{1, 475}_0
c  in DIMACS:
-2582 -2583  2584 -474  2585 0
-2582 -2583  2584 -474 -2586 0
-2582 -2583  2584 -474  2587 0

c  -1+1 --> 0
c    ( b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0 ∧  p_474) -> (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧ -b^{1, 475}_0)
c  in CNF:
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_2
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_1
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_0
c  in DIMACS:
-2582  2583 -2584 -474 -2585 0
-2582  2583 -2584 -474 -2586 0
-2582  2583 -2584 -474 -2587 0

c  0+1 --> 1
c    (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧  p_474) -> (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0)
c  in CNF:
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_2
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_1
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨  b^{1, 475}_0
c  in DIMACS:
 2582  2583  2584 -474 -2585 0
 2582  2583  2584 -474 -2586 0
 2582  2583  2584 -474  2587 0

c  1+1 --> 2
c    (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0 ∧  p_474) -> (-b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0)
c  in CNF:
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_2
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨  b^{1, 475}_1
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ -p_474 ∨ -b^{1, 475}_0
c  in DIMACS:
 2582  2583 -2584 -474 -2585 0
 2582  2583 -2584 -474  2586 0
 2582  2583 -2584 -474 -2587 0

c  2+1 --> break 
c    (-b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧  p_474) -> break
c  in CNF:
c     b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 2582 -2583  2584 -474 1162 0


c  2-1 --> 1
c    (-b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧ -p_474) -> (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0)
c  in CNF:
c     b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_2
c     b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_1
c     b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨  b^{1, 475}_0
c  in DIMACS:
 2582 -2583  2584  474 -2585 0
 2582 -2583  2584  474 -2586 0
 2582 -2583  2584  474  2587 0

c  1-1 --> 0
c    (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0 ∧ -p_474) -> (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧ -b^{1, 475}_0)
c  in CNF:
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_2
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_1
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_0
c  in DIMACS:
 2582  2583 -2584  474 -2585 0
 2582  2583 -2584  474 -2586 0
 2582  2583 -2584  474 -2587 0

c  0-1 --> -1
c    (-b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧ -p_474) -> ( b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0)
c  in CNF:
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨  b^{1, 475}_2
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_1
c     b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨  b^{1, 475}_0
c  in DIMACS:
 2582  2583  2584  474  2585 0
 2582  2583  2584  474 -2586 0
 2582  2583  2584  474  2587 0

c  -1-1 --> -2
c    ( b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧  b^{1, 474}_0 ∧ -p_474) -> ( b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0)
c  in CNF:
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨  b^{1, 475}_2
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨  b^{1, 475}_1
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨  p_474 ∨ -b^{1, 475}_0
c  in DIMACS:
-2582  2583 -2584  474  2585 0
-2582  2583 -2584  474  2586 0
-2582  2583 -2584  474 -2587 0

c  -2-1 --> break 
c    ( b^{1, 474}_2 ∧  b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨  b^{1, 474}_0 ∨  p_474 ∨ break
c  in DIMACS:
-2582 -2583  2584  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 474}_2 ∧ -b^{1, 474}_1 ∧ -b^{1, 474}_0 ∧ true) 
c  in CNF:
c    -b^{1, 474}_2 ∨  b^{1, 474}_1 ∨  b^{1, 474}_0 ∨ false 
c  in DIMACS:
-2582  2583  2584  0

c  3 does not represent an automaton state.
c    -(-b^{1, 474}_2 ∧  b^{1, 474}_1 ∧  b^{1, 474}_0 ∧ true) 
c  in CNF:
c     b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ false 
c  in DIMACS:
 2582 -2583 -2584  0
c  -3 does not represent an automaton state.
c    -( b^{1, 474}_2 ∧  b^{1, 474}_1 ∧  b^{1, 474}_0 ∧ true) 
c  in CNF:
c    -b^{1, 474}_2 ∨ -b^{1, 474}_1 ∨ -b^{1, 474}_0 ∨ false 
c  in DIMACS:
-2582 -2583 -2584  0

c i = 475
c  -2+1 --> -1
c    ( b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧  p_475) -> ( b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0)
c  in CNF:
c    -b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨  b^{1, 476}_2
c    -b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_1
c    -b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨  b^{1, 476}_0
c  in DIMACS:
-2585 -2586  2587 -475  2588 0
-2585 -2586  2587 -475 -2589 0
-2585 -2586  2587 -475  2590 0

c  -1+1 --> 0
c    ( b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0 ∧  p_475) -> (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧ -b^{1, 476}_0)
c  in CNF:
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_2
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_1
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_0
c  in DIMACS:
-2585  2586 -2587 -475 -2588 0
-2585  2586 -2587 -475 -2589 0
-2585  2586 -2587 -475 -2590 0

c  0+1 --> 1
c    (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧  p_475) -> (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0)
c  in CNF:
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_2
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_1
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨  b^{1, 476}_0
c  in DIMACS:
 2585  2586  2587 -475 -2588 0
 2585  2586  2587 -475 -2589 0
 2585  2586  2587 -475  2590 0

c  1+1 --> 2
c    (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0 ∧  p_475) -> (-b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0)
c  in CNF:
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_2
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨  b^{1, 476}_1
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ -p_475 ∨ -b^{1, 476}_0
c  in DIMACS:
 2585  2586 -2587 -475 -2588 0
 2585  2586 -2587 -475  2589 0
 2585  2586 -2587 -475 -2590 0

c  2+1 --> break 
c    (-b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧  p_475) -> break
c  in CNF:
c     b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ -p_475 ∨ break
c  in DIMACS:
 2585 -2586  2587 -475 1162 0


c  2-1 --> 1
c    (-b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧ -p_475) -> (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0)
c  in CNF:
c     b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_2
c     b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_1
c     b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨  b^{1, 476}_0
c  in DIMACS:
 2585 -2586  2587  475 -2588 0
 2585 -2586  2587  475 -2589 0
 2585 -2586  2587  475  2590 0

c  1-1 --> 0
c    (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0 ∧ -p_475) -> (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧ -b^{1, 476}_0)
c  in CNF:
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_2
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_1
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_0
c  in DIMACS:
 2585  2586 -2587  475 -2588 0
 2585  2586 -2587  475 -2589 0
 2585  2586 -2587  475 -2590 0

c  0-1 --> -1
c    (-b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧ -p_475) -> ( b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0)
c  in CNF:
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨  b^{1, 476}_2
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_1
c     b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨  b^{1, 476}_0
c  in DIMACS:
 2585  2586  2587  475  2588 0
 2585  2586  2587  475 -2589 0
 2585  2586  2587  475  2590 0

c  -1-1 --> -2
c    ( b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧  b^{1, 475}_0 ∧ -p_475) -> ( b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0)
c  in CNF:
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨  b^{1, 476}_2
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨  b^{1, 476}_1
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨  p_475 ∨ -b^{1, 476}_0
c  in DIMACS:
-2585  2586 -2587  475  2588 0
-2585  2586 -2587  475  2589 0
-2585  2586 -2587  475 -2590 0

c  -2-1 --> break 
c    ( b^{1, 475}_2 ∧  b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧ -p_475) -> break
c  in CNF:
c    -b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨  b^{1, 475}_0 ∨  p_475 ∨ break
c  in DIMACS:
-2585 -2586  2587  475 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 475}_2 ∧ -b^{1, 475}_1 ∧ -b^{1, 475}_0 ∧ true) 
c  in CNF:
c    -b^{1, 475}_2 ∨  b^{1, 475}_1 ∨  b^{1, 475}_0 ∨ false 
c  in DIMACS:
-2585  2586  2587  0

c  3 does not represent an automaton state.
c    -(-b^{1, 475}_2 ∧  b^{1, 475}_1 ∧  b^{1, 475}_0 ∧ true) 
c  in CNF:
c     b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ false 
c  in DIMACS:
 2585 -2586 -2587  0
c  -3 does not represent an automaton state.
c    -( b^{1, 475}_2 ∧  b^{1, 475}_1 ∧  b^{1, 475}_0 ∧ true) 
c  in CNF:
c    -b^{1, 475}_2 ∨ -b^{1, 475}_1 ∨ -b^{1, 475}_0 ∨ false 
c  in DIMACS:
-2585 -2586 -2587  0

c i = 476
c  -2+1 --> -1
c    ( b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧  p_476) -> ( b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0)
c  in CNF:
c    -b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨  b^{1, 477}_2
c    -b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_1
c    -b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨  b^{1, 477}_0
c  in DIMACS:
-2588 -2589  2590 -476  2591 0
-2588 -2589  2590 -476 -2592 0
-2588 -2589  2590 -476  2593 0

c  -1+1 --> 0
c    ( b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0 ∧  p_476) -> (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧ -b^{1, 477}_0)
c  in CNF:
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_2
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_1
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_0
c  in DIMACS:
-2588  2589 -2590 -476 -2591 0
-2588  2589 -2590 -476 -2592 0
-2588  2589 -2590 -476 -2593 0

c  0+1 --> 1
c    (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧  p_476) -> (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0)
c  in CNF:
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_2
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_1
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨  b^{1, 477}_0
c  in DIMACS:
 2588  2589  2590 -476 -2591 0
 2588  2589  2590 -476 -2592 0
 2588  2589  2590 -476  2593 0

c  1+1 --> 2
c    (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0 ∧  p_476) -> (-b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0)
c  in CNF:
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_2
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨  b^{1, 477}_1
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ -p_476 ∨ -b^{1, 477}_0
c  in DIMACS:
 2588  2589 -2590 -476 -2591 0
 2588  2589 -2590 -476  2592 0
 2588  2589 -2590 -476 -2593 0

c  2+1 --> break 
c    (-b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧  p_476) -> break
c  in CNF:
c     b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 2588 -2589  2590 -476 1162 0


c  2-1 --> 1
c    (-b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧ -p_476) -> (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0)
c  in CNF:
c     b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_2
c     b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_1
c     b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨  b^{1, 477}_0
c  in DIMACS:
 2588 -2589  2590  476 -2591 0
 2588 -2589  2590  476 -2592 0
 2588 -2589  2590  476  2593 0

c  1-1 --> 0
c    (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0 ∧ -p_476) -> (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧ -b^{1, 477}_0)
c  in CNF:
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_2
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_1
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_0
c  in DIMACS:
 2588  2589 -2590  476 -2591 0
 2588  2589 -2590  476 -2592 0
 2588  2589 -2590  476 -2593 0

c  0-1 --> -1
c    (-b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧ -p_476) -> ( b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0)
c  in CNF:
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨  b^{1, 477}_2
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_1
c     b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨  b^{1, 477}_0
c  in DIMACS:
 2588  2589  2590  476  2591 0
 2588  2589  2590  476 -2592 0
 2588  2589  2590  476  2593 0

c  -1-1 --> -2
c    ( b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧  b^{1, 476}_0 ∧ -p_476) -> ( b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0)
c  in CNF:
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨  b^{1, 477}_2
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨  b^{1, 477}_1
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨  p_476 ∨ -b^{1, 477}_0
c  in DIMACS:
-2588  2589 -2590  476  2591 0
-2588  2589 -2590  476  2592 0
-2588  2589 -2590  476 -2593 0

c  -2-1 --> break 
c    ( b^{1, 476}_2 ∧  b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨  b^{1, 476}_0 ∨  p_476 ∨ break
c  in DIMACS:
-2588 -2589  2590  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 476}_2 ∧ -b^{1, 476}_1 ∧ -b^{1, 476}_0 ∧ true) 
c  in CNF:
c    -b^{1, 476}_2 ∨  b^{1, 476}_1 ∨  b^{1, 476}_0 ∨ false 
c  in DIMACS:
-2588  2589  2590  0

c  3 does not represent an automaton state.
c    -(-b^{1, 476}_2 ∧  b^{1, 476}_1 ∧  b^{1, 476}_0 ∧ true) 
c  in CNF:
c     b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ false 
c  in DIMACS:
 2588 -2589 -2590  0
c  -3 does not represent an automaton state.
c    -( b^{1, 476}_2 ∧  b^{1, 476}_1 ∧  b^{1, 476}_0 ∧ true) 
c  in CNF:
c    -b^{1, 476}_2 ∨ -b^{1, 476}_1 ∨ -b^{1, 476}_0 ∨ false 
c  in DIMACS:
-2588 -2589 -2590  0

c i = 477
c  -2+1 --> -1
c    ( b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧  p_477) -> ( b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0)
c  in CNF:
c    -b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨  b^{1, 478}_2
c    -b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_1
c    -b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨  b^{1, 478}_0
c  in DIMACS:
-2591 -2592  2593 -477  2594 0
-2591 -2592  2593 -477 -2595 0
-2591 -2592  2593 -477  2596 0

c  -1+1 --> 0
c    ( b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0 ∧  p_477) -> (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧ -b^{1, 478}_0)
c  in CNF:
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_2
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_1
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_0
c  in DIMACS:
-2591  2592 -2593 -477 -2594 0
-2591  2592 -2593 -477 -2595 0
-2591  2592 -2593 -477 -2596 0

c  0+1 --> 1
c    (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧  p_477) -> (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0)
c  in CNF:
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_2
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_1
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨  b^{1, 478}_0
c  in DIMACS:
 2591  2592  2593 -477 -2594 0
 2591  2592  2593 -477 -2595 0
 2591  2592  2593 -477  2596 0

c  1+1 --> 2
c    (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0 ∧  p_477) -> (-b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0)
c  in CNF:
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_2
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨  b^{1, 478}_1
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ -p_477 ∨ -b^{1, 478}_0
c  in DIMACS:
 2591  2592 -2593 -477 -2594 0
 2591  2592 -2593 -477  2595 0
 2591  2592 -2593 -477 -2596 0

c  2+1 --> break 
c    (-b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧  p_477) -> break
c  in CNF:
c     b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ -p_477 ∨ break
c  in DIMACS:
 2591 -2592  2593 -477 1162 0


c  2-1 --> 1
c    (-b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧ -p_477) -> (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0)
c  in CNF:
c     b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_2
c     b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_1
c     b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨  b^{1, 478}_0
c  in DIMACS:
 2591 -2592  2593  477 -2594 0
 2591 -2592  2593  477 -2595 0
 2591 -2592  2593  477  2596 0

c  1-1 --> 0
c    (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0 ∧ -p_477) -> (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧ -b^{1, 478}_0)
c  in CNF:
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_2
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_1
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_0
c  in DIMACS:
 2591  2592 -2593  477 -2594 0
 2591  2592 -2593  477 -2595 0
 2591  2592 -2593  477 -2596 0

c  0-1 --> -1
c    (-b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧ -p_477) -> ( b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0)
c  in CNF:
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨  b^{1, 478}_2
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_1
c     b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨  b^{1, 478}_0
c  in DIMACS:
 2591  2592  2593  477  2594 0
 2591  2592  2593  477 -2595 0
 2591  2592  2593  477  2596 0

c  -1-1 --> -2
c    ( b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧  b^{1, 477}_0 ∧ -p_477) -> ( b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0)
c  in CNF:
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨  b^{1, 478}_2
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨  b^{1, 478}_1
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨  p_477 ∨ -b^{1, 478}_0
c  in DIMACS:
-2591  2592 -2593  477  2594 0
-2591  2592 -2593  477  2595 0
-2591  2592 -2593  477 -2596 0

c  -2-1 --> break 
c    ( b^{1, 477}_2 ∧  b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧ -p_477) -> break
c  in CNF:
c    -b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨  b^{1, 477}_0 ∨  p_477 ∨ break
c  in DIMACS:
-2591 -2592  2593  477 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 477}_2 ∧ -b^{1, 477}_1 ∧ -b^{1, 477}_0 ∧ true) 
c  in CNF:
c    -b^{1, 477}_2 ∨  b^{1, 477}_1 ∨  b^{1, 477}_0 ∨ false 
c  in DIMACS:
-2591  2592  2593  0

c  3 does not represent an automaton state.
c    -(-b^{1, 477}_2 ∧  b^{1, 477}_1 ∧  b^{1, 477}_0 ∧ true) 
c  in CNF:
c     b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ false 
c  in DIMACS:
 2591 -2592 -2593  0
c  -3 does not represent an automaton state.
c    -( b^{1, 477}_2 ∧  b^{1, 477}_1 ∧  b^{1, 477}_0 ∧ true) 
c  in CNF:
c    -b^{1, 477}_2 ∨ -b^{1, 477}_1 ∨ -b^{1, 477}_0 ∨ false 
c  in DIMACS:
-2591 -2592 -2593  0

c i = 478
c  -2+1 --> -1
c    ( b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧  p_478) -> ( b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0)
c  in CNF:
c    -b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨  b^{1, 479}_2
c    -b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_1
c    -b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨  b^{1, 479}_0
c  in DIMACS:
-2594 -2595  2596 -478  2597 0
-2594 -2595  2596 -478 -2598 0
-2594 -2595  2596 -478  2599 0

c  -1+1 --> 0
c    ( b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0 ∧  p_478) -> (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧ -b^{1, 479}_0)
c  in CNF:
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_2
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_1
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_0
c  in DIMACS:
-2594  2595 -2596 -478 -2597 0
-2594  2595 -2596 -478 -2598 0
-2594  2595 -2596 -478 -2599 0

c  0+1 --> 1
c    (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧  p_478) -> (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0)
c  in CNF:
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_2
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_1
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨  b^{1, 479}_0
c  in DIMACS:
 2594  2595  2596 -478 -2597 0
 2594  2595  2596 -478 -2598 0
 2594  2595  2596 -478  2599 0

c  1+1 --> 2
c    (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0 ∧  p_478) -> (-b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0)
c  in CNF:
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_2
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨  b^{1, 479}_1
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ -p_478 ∨ -b^{1, 479}_0
c  in DIMACS:
 2594  2595 -2596 -478 -2597 0
 2594  2595 -2596 -478  2598 0
 2594  2595 -2596 -478 -2599 0

c  2+1 --> break 
c    (-b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧  p_478) -> break
c  in CNF:
c     b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ -p_478 ∨ break
c  in DIMACS:
 2594 -2595  2596 -478 1162 0


c  2-1 --> 1
c    (-b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧ -p_478) -> (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0)
c  in CNF:
c     b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_2
c     b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_1
c     b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨  b^{1, 479}_0
c  in DIMACS:
 2594 -2595  2596  478 -2597 0
 2594 -2595  2596  478 -2598 0
 2594 -2595  2596  478  2599 0

c  1-1 --> 0
c    (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0 ∧ -p_478) -> (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧ -b^{1, 479}_0)
c  in CNF:
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_2
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_1
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_0
c  in DIMACS:
 2594  2595 -2596  478 -2597 0
 2594  2595 -2596  478 -2598 0
 2594  2595 -2596  478 -2599 0

c  0-1 --> -1
c    (-b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧ -p_478) -> ( b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0)
c  in CNF:
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨  b^{1, 479}_2
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_1
c     b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨  b^{1, 479}_0
c  in DIMACS:
 2594  2595  2596  478  2597 0
 2594  2595  2596  478 -2598 0
 2594  2595  2596  478  2599 0

c  -1-1 --> -2
c    ( b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧  b^{1, 478}_0 ∧ -p_478) -> ( b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0)
c  in CNF:
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨  b^{1, 479}_2
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨  b^{1, 479}_1
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨  p_478 ∨ -b^{1, 479}_0
c  in DIMACS:
-2594  2595 -2596  478  2597 0
-2594  2595 -2596  478  2598 0
-2594  2595 -2596  478 -2599 0

c  -2-1 --> break 
c    ( b^{1, 478}_2 ∧  b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧ -p_478) -> break
c  in CNF:
c    -b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨  b^{1, 478}_0 ∨  p_478 ∨ break
c  in DIMACS:
-2594 -2595  2596  478 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 478}_2 ∧ -b^{1, 478}_1 ∧ -b^{1, 478}_0 ∧ true) 
c  in CNF:
c    -b^{1, 478}_2 ∨  b^{1, 478}_1 ∨  b^{1, 478}_0 ∨ false 
c  in DIMACS:
-2594  2595  2596  0

c  3 does not represent an automaton state.
c    -(-b^{1, 478}_2 ∧  b^{1, 478}_1 ∧  b^{1, 478}_0 ∧ true) 
c  in CNF:
c     b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ false 
c  in DIMACS:
 2594 -2595 -2596  0
c  -3 does not represent an automaton state.
c    -( b^{1, 478}_2 ∧  b^{1, 478}_1 ∧  b^{1, 478}_0 ∧ true) 
c  in CNF:
c    -b^{1, 478}_2 ∨ -b^{1, 478}_1 ∨ -b^{1, 478}_0 ∨ false 
c  in DIMACS:
-2594 -2595 -2596  0

c i = 479
c  -2+1 --> -1
c    ( b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧  p_479) -> ( b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0)
c  in CNF:
c    -b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨  b^{1, 480}_2
c    -b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_1
c    -b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨  b^{1, 480}_0
c  in DIMACS:
-2597 -2598  2599 -479  2600 0
-2597 -2598  2599 -479 -2601 0
-2597 -2598  2599 -479  2602 0

c  -1+1 --> 0
c    ( b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0 ∧  p_479) -> (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧ -b^{1, 480}_0)
c  in CNF:
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_2
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_1
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_0
c  in DIMACS:
-2597  2598 -2599 -479 -2600 0
-2597  2598 -2599 -479 -2601 0
-2597  2598 -2599 -479 -2602 0

c  0+1 --> 1
c    (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧  p_479) -> (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0)
c  in CNF:
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_2
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_1
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨  b^{1, 480}_0
c  in DIMACS:
 2597  2598  2599 -479 -2600 0
 2597  2598  2599 -479 -2601 0
 2597  2598  2599 -479  2602 0

c  1+1 --> 2
c    (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0 ∧  p_479) -> (-b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0)
c  in CNF:
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_2
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨  b^{1, 480}_1
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ -p_479 ∨ -b^{1, 480}_0
c  in DIMACS:
 2597  2598 -2599 -479 -2600 0
 2597  2598 -2599 -479  2601 0
 2597  2598 -2599 -479 -2602 0

c  2+1 --> break 
c    (-b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧  p_479) -> break
c  in CNF:
c     b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ -p_479 ∨ break
c  in DIMACS:
 2597 -2598  2599 -479 1162 0


c  2-1 --> 1
c    (-b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧ -p_479) -> (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0)
c  in CNF:
c     b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_2
c     b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_1
c     b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨  b^{1, 480}_0
c  in DIMACS:
 2597 -2598  2599  479 -2600 0
 2597 -2598  2599  479 -2601 0
 2597 -2598  2599  479  2602 0

c  1-1 --> 0
c    (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0 ∧ -p_479) -> (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧ -b^{1, 480}_0)
c  in CNF:
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_2
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_1
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_0
c  in DIMACS:
 2597  2598 -2599  479 -2600 0
 2597  2598 -2599  479 -2601 0
 2597  2598 -2599  479 -2602 0

c  0-1 --> -1
c    (-b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧ -p_479) -> ( b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0)
c  in CNF:
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨  b^{1, 480}_2
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_1
c     b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨  b^{1, 480}_0
c  in DIMACS:
 2597  2598  2599  479  2600 0
 2597  2598  2599  479 -2601 0
 2597  2598  2599  479  2602 0

c  -1-1 --> -2
c    ( b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧  b^{1, 479}_0 ∧ -p_479) -> ( b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0)
c  in CNF:
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨  b^{1, 480}_2
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨  b^{1, 480}_1
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨  p_479 ∨ -b^{1, 480}_0
c  in DIMACS:
-2597  2598 -2599  479  2600 0
-2597  2598 -2599  479  2601 0
-2597  2598 -2599  479 -2602 0

c  -2-1 --> break 
c    ( b^{1, 479}_2 ∧  b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧ -p_479) -> break
c  in CNF:
c    -b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨  b^{1, 479}_0 ∨  p_479 ∨ break
c  in DIMACS:
-2597 -2598  2599  479 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 479}_2 ∧ -b^{1, 479}_1 ∧ -b^{1, 479}_0 ∧ true) 
c  in CNF:
c    -b^{1, 479}_2 ∨  b^{1, 479}_1 ∨  b^{1, 479}_0 ∨ false 
c  in DIMACS:
-2597  2598  2599  0

c  3 does not represent an automaton state.
c    -(-b^{1, 479}_2 ∧  b^{1, 479}_1 ∧  b^{1, 479}_0 ∧ true) 
c  in CNF:
c     b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ false 
c  in DIMACS:
 2597 -2598 -2599  0
c  -3 does not represent an automaton state.
c    -( b^{1, 479}_2 ∧  b^{1, 479}_1 ∧  b^{1, 479}_0 ∧ true) 
c  in CNF:
c    -b^{1, 479}_2 ∨ -b^{1, 479}_1 ∨ -b^{1, 479}_0 ∨ false 
c  in DIMACS:
-2597 -2598 -2599  0

c i = 480
c  -2+1 --> -1
c    ( b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧  p_480) -> ( b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0)
c  in CNF:
c    -b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨  b^{1, 481}_2
c    -b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_1
c    -b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨  b^{1, 481}_0
c  in DIMACS:
-2600 -2601  2602 -480  2603 0
-2600 -2601  2602 -480 -2604 0
-2600 -2601  2602 -480  2605 0

c  -1+1 --> 0
c    ( b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0 ∧  p_480) -> (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧ -b^{1, 481}_0)
c  in CNF:
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_2
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_1
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_0
c  in DIMACS:
-2600  2601 -2602 -480 -2603 0
-2600  2601 -2602 -480 -2604 0
-2600  2601 -2602 -480 -2605 0

c  0+1 --> 1
c    (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧  p_480) -> (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0)
c  in CNF:
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_2
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_1
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨  b^{1, 481}_0
c  in DIMACS:
 2600  2601  2602 -480 -2603 0
 2600  2601  2602 -480 -2604 0
 2600  2601  2602 -480  2605 0

c  1+1 --> 2
c    (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0 ∧  p_480) -> (-b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0)
c  in CNF:
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_2
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨  b^{1, 481}_1
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ -p_480 ∨ -b^{1, 481}_0
c  in DIMACS:
 2600  2601 -2602 -480 -2603 0
 2600  2601 -2602 -480  2604 0
 2600  2601 -2602 -480 -2605 0

c  2+1 --> break 
c    (-b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧  p_480) -> break
c  in CNF:
c     b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 2600 -2601  2602 -480 1162 0


c  2-1 --> 1
c    (-b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧ -p_480) -> (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0)
c  in CNF:
c     b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_2
c     b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_1
c     b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨  b^{1, 481}_0
c  in DIMACS:
 2600 -2601  2602  480 -2603 0
 2600 -2601  2602  480 -2604 0
 2600 -2601  2602  480  2605 0

c  1-1 --> 0
c    (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0 ∧ -p_480) -> (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧ -b^{1, 481}_0)
c  in CNF:
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_2
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_1
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_0
c  in DIMACS:
 2600  2601 -2602  480 -2603 0
 2600  2601 -2602  480 -2604 0
 2600  2601 -2602  480 -2605 0

c  0-1 --> -1
c    (-b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧ -p_480) -> ( b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0)
c  in CNF:
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨  b^{1, 481}_2
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_1
c     b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨  b^{1, 481}_0
c  in DIMACS:
 2600  2601  2602  480  2603 0
 2600  2601  2602  480 -2604 0
 2600  2601  2602  480  2605 0

c  -1-1 --> -2
c    ( b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧  b^{1, 480}_0 ∧ -p_480) -> ( b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0)
c  in CNF:
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨  b^{1, 481}_2
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨  b^{1, 481}_1
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨  p_480 ∨ -b^{1, 481}_0
c  in DIMACS:
-2600  2601 -2602  480  2603 0
-2600  2601 -2602  480  2604 0
-2600  2601 -2602  480 -2605 0

c  -2-1 --> break 
c    ( b^{1, 480}_2 ∧  b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨  b^{1, 480}_0 ∨  p_480 ∨ break
c  in DIMACS:
-2600 -2601  2602  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 480}_2 ∧ -b^{1, 480}_1 ∧ -b^{1, 480}_0 ∧ true) 
c  in CNF:
c    -b^{1, 480}_2 ∨  b^{1, 480}_1 ∨  b^{1, 480}_0 ∨ false 
c  in DIMACS:
-2600  2601  2602  0

c  3 does not represent an automaton state.
c    -(-b^{1, 480}_2 ∧  b^{1, 480}_1 ∧  b^{1, 480}_0 ∧ true) 
c  in CNF:
c     b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ false 
c  in DIMACS:
 2600 -2601 -2602  0
c  -3 does not represent an automaton state.
c    -( b^{1, 480}_2 ∧  b^{1, 480}_1 ∧  b^{1, 480}_0 ∧ true) 
c  in CNF:
c    -b^{1, 480}_2 ∨ -b^{1, 480}_1 ∨ -b^{1, 480}_0 ∨ false 
c  in DIMACS:
-2600 -2601 -2602  0

c i = 481
c  -2+1 --> -1
c    ( b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧  p_481) -> ( b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0)
c  in CNF:
c    -b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨  b^{1, 482}_2
c    -b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_1
c    -b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨  b^{1, 482}_0
c  in DIMACS:
-2603 -2604  2605 -481  2606 0
-2603 -2604  2605 -481 -2607 0
-2603 -2604  2605 -481  2608 0

c  -1+1 --> 0
c    ( b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0 ∧  p_481) -> (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧ -b^{1, 482}_0)
c  in CNF:
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_2
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_1
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_0
c  in DIMACS:
-2603  2604 -2605 -481 -2606 0
-2603  2604 -2605 -481 -2607 0
-2603  2604 -2605 -481 -2608 0

c  0+1 --> 1
c    (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧  p_481) -> (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0)
c  in CNF:
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_2
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_1
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨  b^{1, 482}_0
c  in DIMACS:
 2603  2604  2605 -481 -2606 0
 2603  2604  2605 -481 -2607 0
 2603  2604  2605 -481  2608 0

c  1+1 --> 2
c    (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0 ∧  p_481) -> (-b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0)
c  in CNF:
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_2
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨  b^{1, 482}_1
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ -p_481 ∨ -b^{1, 482}_0
c  in DIMACS:
 2603  2604 -2605 -481 -2606 0
 2603  2604 -2605 -481  2607 0
 2603  2604 -2605 -481 -2608 0

c  2+1 --> break 
c    (-b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧  p_481) -> break
c  in CNF:
c     b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ -p_481 ∨ break
c  in DIMACS:
 2603 -2604  2605 -481 1162 0


c  2-1 --> 1
c    (-b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧ -p_481) -> (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0)
c  in CNF:
c     b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_2
c     b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_1
c     b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨  b^{1, 482}_0
c  in DIMACS:
 2603 -2604  2605  481 -2606 0
 2603 -2604  2605  481 -2607 0
 2603 -2604  2605  481  2608 0

c  1-1 --> 0
c    (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0 ∧ -p_481) -> (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧ -b^{1, 482}_0)
c  in CNF:
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_2
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_1
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_0
c  in DIMACS:
 2603  2604 -2605  481 -2606 0
 2603  2604 -2605  481 -2607 0
 2603  2604 -2605  481 -2608 0

c  0-1 --> -1
c    (-b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧ -p_481) -> ( b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0)
c  in CNF:
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨  b^{1, 482}_2
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_1
c     b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨  b^{1, 482}_0
c  in DIMACS:
 2603  2604  2605  481  2606 0
 2603  2604  2605  481 -2607 0
 2603  2604  2605  481  2608 0

c  -1-1 --> -2
c    ( b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧  b^{1, 481}_0 ∧ -p_481) -> ( b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0)
c  in CNF:
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨  b^{1, 482}_2
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨  b^{1, 482}_1
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨  p_481 ∨ -b^{1, 482}_0
c  in DIMACS:
-2603  2604 -2605  481  2606 0
-2603  2604 -2605  481  2607 0
-2603  2604 -2605  481 -2608 0

c  -2-1 --> break 
c    ( b^{1, 481}_2 ∧  b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧ -p_481) -> break
c  in CNF:
c    -b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨  b^{1, 481}_0 ∨  p_481 ∨ break
c  in DIMACS:
-2603 -2604  2605  481 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 481}_2 ∧ -b^{1, 481}_1 ∧ -b^{1, 481}_0 ∧ true) 
c  in CNF:
c    -b^{1, 481}_2 ∨  b^{1, 481}_1 ∨  b^{1, 481}_0 ∨ false 
c  in DIMACS:
-2603  2604  2605  0

c  3 does not represent an automaton state.
c    -(-b^{1, 481}_2 ∧  b^{1, 481}_1 ∧  b^{1, 481}_0 ∧ true) 
c  in CNF:
c     b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ false 
c  in DIMACS:
 2603 -2604 -2605  0
c  -3 does not represent an automaton state.
c    -( b^{1, 481}_2 ∧  b^{1, 481}_1 ∧  b^{1, 481}_0 ∧ true) 
c  in CNF:
c    -b^{1, 481}_2 ∨ -b^{1, 481}_1 ∨ -b^{1, 481}_0 ∨ false 
c  in DIMACS:
-2603 -2604 -2605  0

c i = 482
c  -2+1 --> -1
c    ( b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧  p_482) -> ( b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0)
c  in CNF:
c    -b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨  b^{1, 483}_2
c    -b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_1
c    -b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨  b^{1, 483}_0
c  in DIMACS:
-2606 -2607  2608 -482  2609 0
-2606 -2607  2608 -482 -2610 0
-2606 -2607  2608 -482  2611 0

c  -1+1 --> 0
c    ( b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0 ∧  p_482) -> (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧ -b^{1, 483}_0)
c  in CNF:
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_2
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_1
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_0
c  in DIMACS:
-2606  2607 -2608 -482 -2609 0
-2606  2607 -2608 -482 -2610 0
-2606  2607 -2608 -482 -2611 0

c  0+1 --> 1
c    (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧  p_482) -> (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0)
c  in CNF:
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_2
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_1
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨  b^{1, 483}_0
c  in DIMACS:
 2606  2607  2608 -482 -2609 0
 2606  2607  2608 -482 -2610 0
 2606  2607  2608 -482  2611 0

c  1+1 --> 2
c    (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0 ∧  p_482) -> (-b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0)
c  in CNF:
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_2
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨  b^{1, 483}_1
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ -p_482 ∨ -b^{1, 483}_0
c  in DIMACS:
 2606  2607 -2608 -482 -2609 0
 2606  2607 -2608 -482  2610 0
 2606  2607 -2608 -482 -2611 0

c  2+1 --> break 
c    (-b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧  p_482) -> break
c  in CNF:
c     b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ -p_482 ∨ break
c  in DIMACS:
 2606 -2607  2608 -482 1162 0


c  2-1 --> 1
c    (-b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧ -p_482) -> (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0)
c  in CNF:
c     b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_2
c     b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_1
c     b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨  b^{1, 483}_0
c  in DIMACS:
 2606 -2607  2608  482 -2609 0
 2606 -2607  2608  482 -2610 0
 2606 -2607  2608  482  2611 0

c  1-1 --> 0
c    (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0 ∧ -p_482) -> (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧ -b^{1, 483}_0)
c  in CNF:
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_2
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_1
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_0
c  in DIMACS:
 2606  2607 -2608  482 -2609 0
 2606  2607 -2608  482 -2610 0
 2606  2607 -2608  482 -2611 0

c  0-1 --> -1
c    (-b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧ -p_482) -> ( b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0)
c  in CNF:
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨  b^{1, 483}_2
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_1
c     b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨  b^{1, 483}_0
c  in DIMACS:
 2606  2607  2608  482  2609 0
 2606  2607  2608  482 -2610 0
 2606  2607  2608  482  2611 0

c  -1-1 --> -2
c    ( b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧  b^{1, 482}_0 ∧ -p_482) -> ( b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0)
c  in CNF:
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨  b^{1, 483}_2
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨  b^{1, 483}_1
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨  p_482 ∨ -b^{1, 483}_0
c  in DIMACS:
-2606  2607 -2608  482  2609 0
-2606  2607 -2608  482  2610 0
-2606  2607 -2608  482 -2611 0

c  -2-1 --> break 
c    ( b^{1, 482}_2 ∧  b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧ -p_482) -> break
c  in CNF:
c    -b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨  b^{1, 482}_0 ∨  p_482 ∨ break
c  in DIMACS:
-2606 -2607  2608  482 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 482}_2 ∧ -b^{1, 482}_1 ∧ -b^{1, 482}_0 ∧ true) 
c  in CNF:
c    -b^{1, 482}_2 ∨  b^{1, 482}_1 ∨  b^{1, 482}_0 ∨ false 
c  in DIMACS:
-2606  2607  2608  0

c  3 does not represent an automaton state.
c    -(-b^{1, 482}_2 ∧  b^{1, 482}_1 ∧  b^{1, 482}_0 ∧ true) 
c  in CNF:
c     b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ false 
c  in DIMACS:
 2606 -2607 -2608  0
c  -3 does not represent an automaton state.
c    -( b^{1, 482}_2 ∧  b^{1, 482}_1 ∧  b^{1, 482}_0 ∧ true) 
c  in CNF:
c    -b^{1, 482}_2 ∨ -b^{1, 482}_1 ∨ -b^{1, 482}_0 ∨ false 
c  in DIMACS:
-2606 -2607 -2608  0

c i = 483
c  -2+1 --> -1
c    ( b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧  p_483) -> ( b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0)
c  in CNF:
c    -b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨  b^{1, 484}_2
c    -b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_1
c    -b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨  b^{1, 484}_0
c  in DIMACS:
-2609 -2610  2611 -483  2612 0
-2609 -2610  2611 -483 -2613 0
-2609 -2610  2611 -483  2614 0

c  -1+1 --> 0
c    ( b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0 ∧  p_483) -> (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧ -b^{1, 484}_0)
c  in CNF:
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_2
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_1
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_0
c  in DIMACS:
-2609  2610 -2611 -483 -2612 0
-2609  2610 -2611 -483 -2613 0
-2609  2610 -2611 -483 -2614 0

c  0+1 --> 1
c    (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧  p_483) -> (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0)
c  in CNF:
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_2
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_1
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨  b^{1, 484}_0
c  in DIMACS:
 2609  2610  2611 -483 -2612 0
 2609  2610  2611 -483 -2613 0
 2609  2610  2611 -483  2614 0

c  1+1 --> 2
c    (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0 ∧  p_483) -> (-b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0)
c  in CNF:
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_2
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨  b^{1, 484}_1
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ -p_483 ∨ -b^{1, 484}_0
c  in DIMACS:
 2609  2610 -2611 -483 -2612 0
 2609  2610 -2611 -483  2613 0
 2609  2610 -2611 -483 -2614 0

c  2+1 --> break 
c    (-b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧  p_483) -> break
c  in CNF:
c     b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 2609 -2610  2611 -483 1162 0


c  2-1 --> 1
c    (-b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧ -p_483) -> (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0)
c  in CNF:
c     b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_2
c     b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_1
c     b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨  b^{1, 484}_0
c  in DIMACS:
 2609 -2610  2611  483 -2612 0
 2609 -2610  2611  483 -2613 0
 2609 -2610  2611  483  2614 0

c  1-1 --> 0
c    (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0 ∧ -p_483) -> (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧ -b^{1, 484}_0)
c  in CNF:
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_2
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_1
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_0
c  in DIMACS:
 2609  2610 -2611  483 -2612 0
 2609  2610 -2611  483 -2613 0
 2609  2610 -2611  483 -2614 0

c  0-1 --> -1
c    (-b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧ -p_483) -> ( b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0)
c  in CNF:
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨  b^{1, 484}_2
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_1
c     b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨  b^{1, 484}_0
c  in DIMACS:
 2609  2610  2611  483  2612 0
 2609  2610  2611  483 -2613 0
 2609  2610  2611  483  2614 0

c  -1-1 --> -2
c    ( b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧  b^{1, 483}_0 ∧ -p_483) -> ( b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0)
c  in CNF:
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨  b^{1, 484}_2
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨  b^{1, 484}_1
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨  p_483 ∨ -b^{1, 484}_0
c  in DIMACS:
-2609  2610 -2611  483  2612 0
-2609  2610 -2611  483  2613 0
-2609  2610 -2611  483 -2614 0

c  -2-1 --> break 
c    ( b^{1, 483}_2 ∧  b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨  b^{1, 483}_0 ∨  p_483 ∨ break
c  in DIMACS:
-2609 -2610  2611  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 483}_2 ∧ -b^{1, 483}_1 ∧ -b^{1, 483}_0 ∧ true) 
c  in CNF:
c    -b^{1, 483}_2 ∨  b^{1, 483}_1 ∨  b^{1, 483}_0 ∨ false 
c  in DIMACS:
-2609  2610  2611  0

c  3 does not represent an automaton state.
c    -(-b^{1, 483}_2 ∧  b^{1, 483}_1 ∧  b^{1, 483}_0 ∧ true) 
c  in CNF:
c     b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ false 
c  in DIMACS:
 2609 -2610 -2611  0
c  -3 does not represent an automaton state.
c    -( b^{1, 483}_2 ∧  b^{1, 483}_1 ∧  b^{1, 483}_0 ∧ true) 
c  in CNF:
c    -b^{1, 483}_2 ∨ -b^{1, 483}_1 ∨ -b^{1, 483}_0 ∨ false 
c  in DIMACS:
-2609 -2610 -2611  0

c i = 484
c  -2+1 --> -1
c    ( b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧  p_484) -> ( b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0)
c  in CNF:
c    -b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨  b^{1, 485}_2
c    -b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_1
c    -b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨  b^{1, 485}_0
c  in DIMACS:
-2612 -2613  2614 -484  2615 0
-2612 -2613  2614 -484 -2616 0
-2612 -2613  2614 -484  2617 0

c  -1+1 --> 0
c    ( b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0 ∧  p_484) -> (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧ -b^{1, 485}_0)
c  in CNF:
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_2
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_1
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_0
c  in DIMACS:
-2612  2613 -2614 -484 -2615 0
-2612  2613 -2614 -484 -2616 0
-2612  2613 -2614 -484 -2617 0

c  0+1 --> 1
c    (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧  p_484) -> (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0)
c  in CNF:
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_2
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_1
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨  b^{1, 485}_0
c  in DIMACS:
 2612  2613  2614 -484 -2615 0
 2612  2613  2614 -484 -2616 0
 2612  2613  2614 -484  2617 0

c  1+1 --> 2
c    (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0 ∧  p_484) -> (-b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0)
c  in CNF:
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_2
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨  b^{1, 485}_1
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ -p_484 ∨ -b^{1, 485}_0
c  in DIMACS:
 2612  2613 -2614 -484 -2615 0
 2612  2613 -2614 -484  2616 0
 2612  2613 -2614 -484 -2617 0

c  2+1 --> break 
c    (-b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧  p_484) -> break
c  in CNF:
c     b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 2612 -2613  2614 -484 1162 0


c  2-1 --> 1
c    (-b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧ -p_484) -> (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0)
c  in CNF:
c     b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_2
c     b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_1
c     b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨  b^{1, 485}_0
c  in DIMACS:
 2612 -2613  2614  484 -2615 0
 2612 -2613  2614  484 -2616 0
 2612 -2613  2614  484  2617 0

c  1-1 --> 0
c    (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0 ∧ -p_484) -> (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧ -b^{1, 485}_0)
c  in CNF:
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_2
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_1
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_0
c  in DIMACS:
 2612  2613 -2614  484 -2615 0
 2612  2613 -2614  484 -2616 0
 2612  2613 -2614  484 -2617 0

c  0-1 --> -1
c    (-b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧ -p_484) -> ( b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0)
c  in CNF:
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨  b^{1, 485}_2
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_1
c     b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨  b^{1, 485}_0
c  in DIMACS:
 2612  2613  2614  484  2615 0
 2612  2613  2614  484 -2616 0
 2612  2613  2614  484  2617 0

c  -1-1 --> -2
c    ( b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧  b^{1, 484}_0 ∧ -p_484) -> ( b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0)
c  in CNF:
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨  b^{1, 485}_2
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨  b^{1, 485}_1
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨  p_484 ∨ -b^{1, 485}_0
c  in DIMACS:
-2612  2613 -2614  484  2615 0
-2612  2613 -2614  484  2616 0
-2612  2613 -2614  484 -2617 0

c  -2-1 --> break 
c    ( b^{1, 484}_2 ∧  b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨  b^{1, 484}_0 ∨  p_484 ∨ break
c  in DIMACS:
-2612 -2613  2614  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 484}_2 ∧ -b^{1, 484}_1 ∧ -b^{1, 484}_0 ∧ true) 
c  in CNF:
c    -b^{1, 484}_2 ∨  b^{1, 484}_1 ∨  b^{1, 484}_0 ∨ false 
c  in DIMACS:
-2612  2613  2614  0

c  3 does not represent an automaton state.
c    -(-b^{1, 484}_2 ∧  b^{1, 484}_1 ∧  b^{1, 484}_0 ∧ true) 
c  in CNF:
c     b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ false 
c  in DIMACS:
 2612 -2613 -2614  0
c  -3 does not represent an automaton state.
c    -( b^{1, 484}_2 ∧  b^{1, 484}_1 ∧  b^{1, 484}_0 ∧ true) 
c  in CNF:
c    -b^{1, 484}_2 ∨ -b^{1, 484}_1 ∨ -b^{1, 484}_0 ∨ false 
c  in DIMACS:
-2612 -2613 -2614  0

c i = 485
c  -2+1 --> -1
c    ( b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧  p_485) -> ( b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0)
c  in CNF:
c    -b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨  b^{1, 486}_2
c    -b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_1
c    -b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨  b^{1, 486}_0
c  in DIMACS:
-2615 -2616  2617 -485  2618 0
-2615 -2616  2617 -485 -2619 0
-2615 -2616  2617 -485  2620 0

c  -1+1 --> 0
c    ( b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0 ∧  p_485) -> (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧ -b^{1, 486}_0)
c  in CNF:
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_2
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_1
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_0
c  in DIMACS:
-2615  2616 -2617 -485 -2618 0
-2615  2616 -2617 -485 -2619 0
-2615  2616 -2617 -485 -2620 0

c  0+1 --> 1
c    (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧  p_485) -> (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0)
c  in CNF:
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_2
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_1
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨  b^{1, 486}_0
c  in DIMACS:
 2615  2616  2617 -485 -2618 0
 2615  2616  2617 -485 -2619 0
 2615  2616  2617 -485  2620 0

c  1+1 --> 2
c    (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0 ∧  p_485) -> (-b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0)
c  in CNF:
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_2
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨  b^{1, 486}_1
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ -p_485 ∨ -b^{1, 486}_0
c  in DIMACS:
 2615  2616 -2617 -485 -2618 0
 2615  2616 -2617 -485  2619 0
 2615  2616 -2617 -485 -2620 0

c  2+1 --> break 
c    (-b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧  p_485) -> break
c  in CNF:
c     b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ -p_485 ∨ break
c  in DIMACS:
 2615 -2616  2617 -485 1162 0


c  2-1 --> 1
c    (-b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧ -p_485) -> (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0)
c  in CNF:
c     b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_2
c     b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_1
c     b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨  b^{1, 486}_0
c  in DIMACS:
 2615 -2616  2617  485 -2618 0
 2615 -2616  2617  485 -2619 0
 2615 -2616  2617  485  2620 0

c  1-1 --> 0
c    (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0 ∧ -p_485) -> (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧ -b^{1, 486}_0)
c  in CNF:
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_2
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_1
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_0
c  in DIMACS:
 2615  2616 -2617  485 -2618 0
 2615  2616 -2617  485 -2619 0
 2615  2616 -2617  485 -2620 0

c  0-1 --> -1
c    (-b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧ -p_485) -> ( b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0)
c  in CNF:
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨  b^{1, 486}_2
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_1
c     b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨  b^{1, 486}_0
c  in DIMACS:
 2615  2616  2617  485  2618 0
 2615  2616  2617  485 -2619 0
 2615  2616  2617  485  2620 0

c  -1-1 --> -2
c    ( b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧  b^{1, 485}_0 ∧ -p_485) -> ( b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0)
c  in CNF:
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨  b^{1, 486}_2
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨  b^{1, 486}_1
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨  p_485 ∨ -b^{1, 486}_0
c  in DIMACS:
-2615  2616 -2617  485  2618 0
-2615  2616 -2617  485  2619 0
-2615  2616 -2617  485 -2620 0

c  -2-1 --> break 
c    ( b^{1, 485}_2 ∧  b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧ -p_485) -> break
c  in CNF:
c    -b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨  b^{1, 485}_0 ∨  p_485 ∨ break
c  in DIMACS:
-2615 -2616  2617  485 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 485}_2 ∧ -b^{1, 485}_1 ∧ -b^{1, 485}_0 ∧ true) 
c  in CNF:
c    -b^{1, 485}_2 ∨  b^{1, 485}_1 ∨  b^{1, 485}_0 ∨ false 
c  in DIMACS:
-2615  2616  2617  0

c  3 does not represent an automaton state.
c    -(-b^{1, 485}_2 ∧  b^{1, 485}_1 ∧  b^{1, 485}_0 ∧ true) 
c  in CNF:
c     b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ false 
c  in DIMACS:
 2615 -2616 -2617  0
c  -3 does not represent an automaton state.
c    -( b^{1, 485}_2 ∧  b^{1, 485}_1 ∧  b^{1, 485}_0 ∧ true) 
c  in CNF:
c    -b^{1, 485}_2 ∨ -b^{1, 485}_1 ∨ -b^{1, 485}_0 ∨ false 
c  in DIMACS:
-2615 -2616 -2617  0

c i = 486
c  -2+1 --> -1
c    ( b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧  p_486) -> ( b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0)
c  in CNF:
c    -b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨  b^{1, 487}_2
c    -b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_1
c    -b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨  b^{1, 487}_0
c  in DIMACS:
-2618 -2619  2620 -486  2621 0
-2618 -2619  2620 -486 -2622 0
-2618 -2619  2620 -486  2623 0

c  -1+1 --> 0
c    ( b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0 ∧  p_486) -> (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧ -b^{1, 487}_0)
c  in CNF:
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_2
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_1
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_0
c  in DIMACS:
-2618  2619 -2620 -486 -2621 0
-2618  2619 -2620 -486 -2622 0
-2618  2619 -2620 -486 -2623 0

c  0+1 --> 1
c    (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧  p_486) -> (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0)
c  in CNF:
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_2
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_1
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨  b^{1, 487}_0
c  in DIMACS:
 2618  2619  2620 -486 -2621 0
 2618  2619  2620 -486 -2622 0
 2618  2619  2620 -486  2623 0

c  1+1 --> 2
c    (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0 ∧  p_486) -> (-b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0)
c  in CNF:
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_2
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨  b^{1, 487}_1
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ -p_486 ∨ -b^{1, 487}_0
c  in DIMACS:
 2618  2619 -2620 -486 -2621 0
 2618  2619 -2620 -486  2622 0
 2618  2619 -2620 -486 -2623 0

c  2+1 --> break 
c    (-b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧  p_486) -> break
c  in CNF:
c     b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 2618 -2619  2620 -486 1162 0


c  2-1 --> 1
c    (-b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧ -p_486) -> (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0)
c  in CNF:
c     b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_2
c     b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_1
c     b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨  b^{1, 487}_0
c  in DIMACS:
 2618 -2619  2620  486 -2621 0
 2618 -2619  2620  486 -2622 0
 2618 -2619  2620  486  2623 0

c  1-1 --> 0
c    (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0 ∧ -p_486) -> (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧ -b^{1, 487}_0)
c  in CNF:
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_2
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_1
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_0
c  in DIMACS:
 2618  2619 -2620  486 -2621 0
 2618  2619 -2620  486 -2622 0
 2618  2619 -2620  486 -2623 0

c  0-1 --> -1
c    (-b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧ -p_486) -> ( b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0)
c  in CNF:
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨  b^{1, 487}_2
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_1
c     b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨  b^{1, 487}_0
c  in DIMACS:
 2618  2619  2620  486  2621 0
 2618  2619  2620  486 -2622 0
 2618  2619  2620  486  2623 0

c  -1-1 --> -2
c    ( b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧  b^{1, 486}_0 ∧ -p_486) -> ( b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0)
c  in CNF:
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨  b^{1, 487}_2
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨  b^{1, 487}_1
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨  p_486 ∨ -b^{1, 487}_0
c  in DIMACS:
-2618  2619 -2620  486  2621 0
-2618  2619 -2620  486  2622 0
-2618  2619 -2620  486 -2623 0

c  -2-1 --> break 
c    ( b^{1, 486}_2 ∧  b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨  b^{1, 486}_0 ∨  p_486 ∨ break
c  in DIMACS:
-2618 -2619  2620  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 486}_2 ∧ -b^{1, 486}_1 ∧ -b^{1, 486}_0 ∧ true) 
c  in CNF:
c    -b^{1, 486}_2 ∨  b^{1, 486}_1 ∨  b^{1, 486}_0 ∨ false 
c  in DIMACS:
-2618  2619  2620  0

c  3 does not represent an automaton state.
c    -(-b^{1, 486}_2 ∧  b^{1, 486}_1 ∧  b^{1, 486}_0 ∧ true) 
c  in CNF:
c     b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ false 
c  in DIMACS:
 2618 -2619 -2620  0
c  -3 does not represent an automaton state.
c    -( b^{1, 486}_2 ∧  b^{1, 486}_1 ∧  b^{1, 486}_0 ∧ true) 
c  in CNF:
c    -b^{1, 486}_2 ∨ -b^{1, 486}_1 ∨ -b^{1, 486}_0 ∨ false 
c  in DIMACS:
-2618 -2619 -2620  0

c i = 487
c  -2+1 --> -1
c    ( b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧  p_487) -> ( b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0)
c  in CNF:
c    -b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨  b^{1, 488}_2
c    -b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_1
c    -b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨  b^{1, 488}_0
c  in DIMACS:
-2621 -2622  2623 -487  2624 0
-2621 -2622  2623 -487 -2625 0
-2621 -2622  2623 -487  2626 0

c  -1+1 --> 0
c    ( b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0 ∧  p_487) -> (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧ -b^{1, 488}_0)
c  in CNF:
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_2
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_1
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_0
c  in DIMACS:
-2621  2622 -2623 -487 -2624 0
-2621  2622 -2623 -487 -2625 0
-2621  2622 -2623 -487 -2626 0

c  0+1 --> 1
c    (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧  p_487) -> (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0)
c  in CNF:
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_2
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_1
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨  b^{1, 488}_0
c  in DIMACS:
 2621  2622  2623 -487 -2624 0
 2621  2622  2623 -487 -2625 0
 2621  2622  2623 -487  2626 0

c  1+1 --> 2
c    (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0 ∧  p_487) -> (-b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0)
c  in CNF:
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_2
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨  b^{1, 488}_1
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ -p_487 ∨ -b^{1, 488}_0
c  in DIMACS:
 2621  2622 -2623 -487 -2624 0
 2621  2622 -2623 -487  2625 0
 2621  2622 -2623 -487 -2626 0

c  2+1 --> break 
c    (-b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧  p_487) -> break
c  in CNF:
c     b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ -p_487 ∨ break
c  in DIMACS:
 2621 -2622  2623 -487 1162 0


c  2-1 --> 1
c    (-b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧ -p_487) -> (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0)
c  in CNF:
c     b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_2
c     b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_1
c     b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨  b^{1, 488}_0
c  in DIMACS:
 2621 -2622  2623  487 -2624 0
 2621 -2622  2623  487 -2625 0
 2621 -2622  2623  487  2626 0

c  1-1 --> 0
c    (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0 ∧ -p_487) -> (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧ -b^{1, 488}_0)
c  in CNF:
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_2
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_1
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_0
c  in DIMACS:
 2621  2622 -2623  487 -2624 0
 2621  2622 -2623  487 -2625 0
 2621  2622 -2623  487 -2626 0

c  0-1 --> -1
c    (-b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧ -p_487) -> ( b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0)
c  in CNF:
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨  b^{1, 488}_2
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_1
c     b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨  b^{1, 488}_0
c  in DIMACS:
 2621  2622  2623  487  2624 0
 2621  2622  2623  487 -2625 0
 2621  2622  2623  487  2626 0

c  -1-1 --> -2
c    ( b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧  b^{1, 487}_0 ∧ -p_487) -> ( b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0)
c  in CNF:
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨  b^{1, 488}_2
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨  b^{1, 488}_1
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨  p_487 ∨ -b^{1, 488}_0
c  in DIMACS:
-2621  2622 -2623  487  2624 0
-2621  2622 -2623  487  2625 0
-2621  2622 -2623  487 -2626 0

c  -2-1 --> break 
c    ( b^{1, 487}_2 ∧  b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧ -p_487) -> break
c  in CNF:
c    -b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨  b^{1, 487}_0 ∨  p_487 ∨ break
c  in DIMACS:
-2621 -2622  2623  487 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 487}_2 ∧ -b^{1, 487}_1 ∧ -b^{1, 487}_0 ∧ true) 
c  in CNF:
c    -b^{1, 487}_2 ∨  b^{1, 487}_1 ∨  b^{1, 487}_0 ∨ false 
c  in DIMACS:
-2621  2622  2623  0

c  3 does not represent an automaton state.
c    -(-b^{1, 487}_2 ∧  b^{1, 487}_1 ∧  b^{1, 487}_0 ∧ true) 
c  in CNF:
c     b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ false 
c  in DIMACS:
 2621 -2622 -2623  0
c  -3 does not represent an automaton state.
c    -( b^{1, 487}_2 ∧  b^{1, 487}_1 ∧  b^{1, 487}_0 ∧ true) 
c  in CNF:
c    -b^{1, 487}_2 ∨ -b^{1, 487}_1 ∨ -b^{1, 487}_0 ∨ false 
c  in DIMACS:
-2621 -2622 -2623  0

c i = 488
c  -2+1 --> -1
c    ( b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧  p_488) -> ( b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0)
c  in CNF:
c    -b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨  b^{1, 489}_2
c    -b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_1
c    -b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨  b^{1, 489}_0
c  in DIMACS:
-2624 -2625  2626 -488  2627 0
-2624 -2625  2626 -488 -2628 0
-2624 -2625  2626 -488  2629 0

c  -1+1 --> 0
c    ( b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0 ∧  p_488) -> (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧ -b^{1, 489}_0)
c  in CNF:
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_2
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_1
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_0
c  in DIMACS:
-2624  2625 -2626 -488 -2627 0
-2624  2625 -2626 -488 -2628 0
-2624  2625 -2626 -488 -2629 0

c  0+1 --> 1
c    (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧  p_488) -> (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0)
c  in CNF:
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_2
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_1
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨  b^{1, 489}_0
c  in DIMACS:
 2624  2625  2626 -488 -2627 0
 2624  2625  2626 -488 -2628 0
 2624  2625  2626 -488  2629 0

c  1+1 --> 2
c    (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0 ∧  p_488) -> (-b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0)
c  in CNF:
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_2
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨  b^{1, 489}_1
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ -p_488 ∨ -b^{1, 489}_0
c  in DIMACS:
 2624  2625 -2626 -488 -2627 0
 2624  2625 -2626 -488  2628 0
 2624  2625 -2626 -488 -2629 0

c  2+1 --> break 
c    (-b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧  p_488) -> break
c  in CNF:
c     b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 2624 -2625  2626 -488 1162 0


c  2-1 --> 1
c    (-b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧ -p_488) -> (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0)
c  in CNF:
c     b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_2
c     b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_1
c     b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨  b^{1, 489}_0
c  in DIMACS:
 2624 -2625  2626  488 -2627 0
 2624 -2625  2626  488 -2628 0
 2624 -2625  2626  488  2629 0

c  1-1 --> 0
c    (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0 ∧ -p_488) -> (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧ -b^{1, 489}_0)
c  in CNF:
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_2
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_1
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_0
c  in DIMACS:
 2624  2625 -2626  488 -2627 0
 2624  2625 -2626  488 -2628 0
 2624  2625 -2626  488 -2629 0

c  0-1 --> -1
c    (-b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧ -p_488) -> ( b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0)
c  in CNF:
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨  b^{1, 489}_2
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_1
c     b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨  b^{1, 489}_0
c  in DIMACS:
 2624  2625  2626  488  2627 0
 2624  2625  2626  488 -2628 0
 2624  2625  2626  488  2629 0

c  -1-1 --> -2
c    ( b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧  b^{1, 488}_0 ∧ -p_488) -> ( b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0)
c  in CNF:
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨  b^{1, 489}_2
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨  b^{1, 489}_1
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨  p_488 ∨ -b^{1, 489}_0
c  in DIMACS:
-2624  2625 -2626  488  2627 0
-2624  2625 -2626  488  2628 0
-2624  2625 -2626  488 -2629 0

c  -2-1 --> break 
c    ( b^{1, 488}_2 ∧  b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨  b^{1, 488}_0 ∨  p_488 ∨ break
c  in DIMACS:
-2624 -2625  2626  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 488}_2 ∧ -b^{1, 488}_1 ∧ -b^{1, 488}_0 ∧ true) 
c  in CNF:
c    -b^{1, 488}_2 ∨  b^{1, 488}_1 ∨  b^{1, 488}_0 ∨ false 
c  in DIMACS:
-2624  2625  2626  0

c  3 does not represent an automaton state.
c    -(-b^{1, 488}_2 ∧  b^{1, 488}_1 ∧  b^{1, 488}_0 ∧ true) 
c  in CNF:
c     b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ false 
c  in DIMACS:
 2624 -2625 -2626  0
c  -3 does not represent an automaton state.
c    -( b^{1, 488}_2 ∧  b^{1, 488}_1 ∧  b^{1, 488}_0 ∧ true) 
c  in CNF:
c    -b^{1, 488}_2 ∨ -b^{1, 488}_1 ∨ -b^{1, 488}_0 ∨ false 
c  in DIMACS:
-2624 -2625 -2626  0

c i = 489
c  -2+1 --> -1
c    ( b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧  p_489) -> ( b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0)
c  in CNF:
c    -b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨  b^{1, 490}_2
c    -b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_1
c    -b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨  b^{1, 490}_0
c  in DIMACS:
-2627 -2628  2629 -489  2630 0
-2627 -2628  2629 -489 -2631 0
-2627 -2628  2629 -489  2632 0

c  -1+1 --> 0
c    ( b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0 ∧  p_489) -> (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧ -b^{1, 490}_0)
c  in CNF:
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_2
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_1
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_0
c  in DIMACS:
-2627  2628 -2629 -489 -2630 0
-2627  2628 -2629 -489 -2631 0
-2627  2628 -2629 -489 -2632 0

c  0+1 --> 1
c    (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧  p_489) -> (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0)
c  in CNF:
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_2
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_1
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨  b^{1, 490}_0
c  in DIMACS:
 2627  2628  2629 -489 -2630 0
 2627  2628  2629 -489 -2631 0
 2627  2628  2629 -489  2632 0

c  1+1 --> 2
c    (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0 ∧  p_489) -> (-b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0)
c  in CNF:
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_2
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨  b^{1, 490}_1
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ -p_489 ∨ -b^{1, 490}_0
c  in DIMACS:
 2627  2628 -2629 -489 -2630 0
 2627  2628 -2629 -489  2631 0
 2627  2628 -2629 -489 -2632 0

c  2+1 --> break 
c    (-b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧  p_489) -> break
c  in CNF:
c     b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ -p_489 ∨ break
c  in DIMACS:
 2627 -2628  2629 -489 1162 0


c  2-1 --> 1
c    (-b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧ -p_489) -> (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0)
c  in CNF:
c     b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_2
c     b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_1
c     b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨  b^{1, 490}_0
c  in DIMACS:
 2627 -2628  2629  489 -2630 0
 2627 -2628  2629  489 -2631 0
 2627 -2628  2629  489  2632 0

c  1-1 --> 0
c    (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0 ∧ -p_489) -> (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧ -b^{1, 490}_0)
c  in CNF:
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_2
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_1
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_0
c  in DIMACS:
 2627  2628 -2629  489 -2630 0
 2627  2628 -2629  489 -2631 0
 2627  2628 -2629  489 -2632 0

c  0-1 --> -1
c    (-b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧ -p_489) -> ( b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0)
c  in CNF:
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨  b^{1, 490}_2
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_1
c     b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨  b^{1, 490}_0
c  in DIMACS:
 2627  2628  2629  489  2630 0
 2627  2628  2629  489 -2631 0
 2627  2628  2629  489  2632 0

c  -1-1 --> -2
c    ( b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧  b^{1, 489}_0 ∧ -p_489) -> ( b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0)
c  in CNF:
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨  b^{1, 490}_2
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨  b^{1, 490}_1
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨  p_489 ∨ -b^{1, 490}_0
c  in DIMACS:
-2627  2628 -2629  489  2630 0
-2627  2628 -2629  489  2631 0
-2627  2628 -2629  489 -2632 0

c  -2-1 --> break 
c    ( b^{1, 489}_2 ∧  b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧ -p_489) -> break
c  in CNF:
c    -b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨  b^{1, 489}_0 ∨  p_489 ∨ break
c  in DIMACS:
-2627 -2628  2629  489 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 489}_2 ∧ -b^{1, 489}_1 ∧ -b^{1, 489}_0 ∧ true) 
c  in CNF:
c    -b^{1, 489}_2 ∨  b^{1, 489}_1 ∨  b^{1, 489}_0 ∨ false 
c  in DIMACS:
-2627  2628  2629  0

c  3 does not represent an automaton state.
c    -(-b^{1, 489}_2 ∧  b^{1, 489}_1 ∧  b^{1, 489}_0 ∧ true) 
c  in CNF:
c     b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ false 
c  in DIMACS:
 2627 -2628 -2629  0
c  -3 does not represent an automaton state.
c    -( b^{1, 489}_2 ∧  b^{1, 489}_1 ∧  b^{1, 489}_0 ∧ true) 
c  in CNF:
c    -b^{1, 489}_2 ∨ -b^{1, 489}_1 ∨ -b^{1, 489}_0 ∨ false 
c  in DIMACS:
-2627 -2628 -2629  0

c i = 490
c  -2+1 --> -1
c    ( b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧  p_490) -> ( b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0)
c  in CNF:
c    -b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨  b^{1, 491}_2
c    -b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_1
c    -b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨  b^{1, 491}_0
c  in DIMACS:
-2630 -2631  2632 -490  2633 0
-2630 -2631  2632 -490 -2634 0
-2630 -2631  2632 -490  2635 0

c  -1+1 --> 0
c    ( b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0 ∧  p_490) -> (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧ -b^{1, 491}_0)
c  in CNF:
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_2
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_1
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_0
c  in DIMACS:
-2630  2631 -2632 -490 -2633 0
-2630  2631 -2632 -490 -2634 0
-2630  2631 -2632 -490 -2635 0

c  0+1 --> 1
c    (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧  p_490) -> (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0)
c  in CNF:
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_2
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_1
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨  b^{1, 491}_0
c  in DIMACS:
 2630  2631  2632 -490 -2633 0
 2630  2631  2632 -490 -2634 0
 2630  2631  2632 -490  2635 0

c  1+1 --> 2
c    (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0 ∧  p_490) -> (-b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0)
c  in CNF:
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_2
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨  b^{1, 491}_1
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ -p_490 ∨ -b^{1, 491}_0
c  in DIMACS:
 2630  2631 -2632 -490 -2633 0
 2630  2631 -2632 -490  2634 0
 2630  2631 -2632 -490 -2635 0

c  2+1 --> break 
c    (-b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧  p_490) -> break
c  in CNF:
c     b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 2630 -2631  2632 -490 1162 0


c  2-1 --> 1
c    (-b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧ -p_490) -> (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0)
c  in CNF:
c     b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_2
c     b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_1
c     b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨  b^{1, 491}_0
c  in DIMACS:
 2630 -2631  2632  490 -2633 0
 2630 -2631  2632  490 -2634 0
 2630 -2631  2632  490  2635 0

c  1-1 --> 0
c    (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0 ∧ -p_490) -> (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧ -b^{1, 491}_0)
c  in CNF:
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_2
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_1
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_0
c  in DIMACS:
 2630  2631 -2632  490 -2633 0
 2630  2631 -2632  490 -2634 0
 2630  2631 -2632  490 -2635 0

c  0-1 --> -1
c    (-b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧ -p_490) -> ( b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0)
c  in CNF:
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨  b^{1, 491}_2
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_1
c     b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨  b^{1, 491}_0
c  in DIMACS:
 2630  2631  2632  490  2633 0
 2630  2631  2632  490 -2634 0
 2630  2631  2632  490  2635 0

c  -1-1 --> -2
c    ( b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧  b^{1, 490}_0 ∧ -p_490) -> ( b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0)
c  in CNF:
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨  b^{1, 491}_2
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨  b^{1, 491}_1
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨  p_490 ∨ -b^{1, 491}_0
c  in DIMACS:
-2630  2631 -2632  490  2633 0
-2630  2631 -2632  490  2634 0
-2630  2631 -2632  490 -2635 0

c  -2-1 --> break 
c    ( b^{1, 490}_2 ∧  b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨  b^{1, 490}_0 ∨  p_490 ∨ break
c  in DIMACS:
-2630 -2631  2632  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 490}_2 ∧ -b^{1, 490}_1 ∧ -b^{1, 490}_0 ∧ true) 
c  in CNF:
c    -b^{1, 490}_2 ∨  b^{1, 490}_1 ∨  b^{1, 490}_0 ∨ false 
c  in DIMACS:
-2630  2631  2632  0

c  3 does not represent an automaton state.
c    -(-b^{1, 490}_2 ∧  b^{1, 490}_1 ∧  b^{1, 490}_0 ∧ true) 
c  in CNF:
c     b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ false 
c  in DIMACS:
 2630 -2631 -2632  0
c  -3 does not represent an automaton state.
c    -( b^{1, 490}_2 ∧  b^{1, 490}_1 ∧  b^{1, 490}_0 ∧ true) 
c  in CNF:
c    -b^{1, 490}_2 ∨ -b^{1, 490}_1 ∨ -b^{1, 490}_0 ∨ false 
c  in DIMACS:
-2630 -2631 -2632  0

c i = 491
c  -2+1 --> -1
c    ( b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧  p_491) -> ( b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0)
c  in CNF:
c    -b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨  b^{1, 492}_2
c    -b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_1
c    -b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨  b^{1, 492}_0
c  in DIMACS:
-2633 -2634  2635 -491  2636 0
-2633 -2634  2635 -491 -2637 0
-2633 -2634  2635 -491  2638 0

c  -1+1 --> 0
c    ( b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0 ∧  p_491) -> (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧ -b^{1, 492}_0)
c  in CNF:
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_2
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_1
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_0
c  in DIMACS:
-2633  2634 -2635 -491 -2636 0
-2633  2634 -2635 -491 -2637 0
-2633  2634 -2635 -491 -2638 0

c  0+1 --> 1
c    (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧  p_491) -> (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0)
c  in CNF:
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_2
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_1
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨  b^{1, 492}_0
c  in DIMACS:
 2633  2634  2635 -491 -2636 0
 2633  2634  2635 -491 -2637 0
 2633  2634  2635 -491  2638 0

c  1+1 --> 2
c    (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0 ∧  p_491) -> (-b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0)
c  in CNF:
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_2
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨  b^{1, 492}_1
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ -p_491 ∨ -b^{1, 492}_0
c  in DIMACS:
 2633  2634 -2635 -491 -2636 0
 2633  2634 -2635 -491  2637 0
 2633  2634 -2635 -491 -2638 0

c  2+1 --> break 
c    (-b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧  p_491) -> break
c  in CNF:
c     b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ -p_491 ∨ break
c  in DIMACS:
 2633 -2634  2635 -491 1162 0


c  2-1 --> 1
c    (-b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧ -p_491) -> (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0)
c  in CNF:
c     b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_2
c     b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_1
c     b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨  b^{1, 492}_0
c  in DIMACS:
 2633 -2634  2635  491 -2636 0
 2633 -2634  2635  491 -2637 0
 2633 -2634  2635  491  2638 0

c  1-1 --> 0
c    (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0 ∧ -p_491) -> (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧ -b^{1, 492}_0)
c  in CNF:
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_2
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_1
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_0
c  in DIMACS:
 2633  2634 -2635  491 -2636 0
 2633  2634 -2635  491 -2637 0
 2633  2634 -2635  491 -2638 0

c  0-1 --> -1
c    (-b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧ -p_491) -> ( b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0)
c  in CNF:
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨  b^{1, 492}_2
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_1
c     b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨  b^{1, 492}_0
c  in DIMACS:
 2633  2634  2635  491  2636 0
 2633  2634  2635  491 -2637 0
 2633  2634  2635  491  2638 0

c  -1-1 --> -2
c    ( b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧  b^{1, 491}_0 ∧ -p_491) -> ( b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0)
c  in CNF:
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨  b^{1, 492}_2
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨  b^{1, 492}_1
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨  p_491 ∨ -b^{1, 492}_0
c  in DIMACS:
-2633  2634 -2635  491  2636 0
-2633  2634 -2635  491  2637 0
-2633  2634 -2635  491 -2638 0

c  -2-1 --> break 
c    ( b^{1, 491}_2 ∧  b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧ -p_491) -> break
c  in CNF:
c    -b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨  b^{1, 491}_0 ∨  p_491 ∨ break
c  in DIMACS:
-2633 -2634  2635  491 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 491}_2 ∧ -b^{1, 491}_1 ∧ -b^{1, 491}_0 ∧ true) 
c  in CNF:
c    -b^{1, 491}_2 ∨  b^{1, 491}_1 ∨  b^{1, 491}_0 ∨ false 
c  in DIMACS:
-2633  2634  2635  0

c  3 does not represent an automaton state.
c    -(-b^{1, 491}_2 ∧  b^{1, 491}_1 ∧  b^{1, 491}_0 ∧ true) 
c  in CNF:
c     b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ false 
c  in DIMACS:
 2633 -2634 -2635  0
c  -3 does not represent an automaton state.
c    -( b^{1, 491}_2 ∧  b^{1, 491}_1 ∧  b^{1, 491}_0 ∧ true) 
c  in CNF:
c    -b^{1, 491}_2 ∨ -b^{1, 491}_1 ∨ -b^{1, 491}_0 ∨ false 
c  in DIMACS:
-2633 -2634 -2635  0

c i = 492
c  -2+1 --> -1
c    ( b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧  p_492) -> ( b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0)
c  in CNF:
c    -b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨  b^{1, 493}_2
c    -b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_1
c    -b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨  b^{1, 493}_0
c  in DIMACS:
-2636 -2637  2638 -492  2639 0
-2636 -2637  2638 -492 -2640 0
-2636 -2637  2638 -492  2641 0

c  -1+1 --> 0
c    ( b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0 ∧  p_492) -> (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧ -b^{1, 493}_0)
c  in CNF:
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_2
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_1
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_0
c  in DIMACS:
-2636  2637 -2638 -492 -2639 0
-2636  2637 -2638 -492 -2640 0
-2636  2637 -2638 -492 -2641 0

c  0+1 --> 1
c    (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧  p_492) -> (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0)
c  in CNF:
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_2
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_1
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨  b^{1, 493}_0
c  in DIMACS:
 2636  2637  2638 -492 -2639 0
 2636  2637  2638 -492 -2640 0
 2636  2637  2638 -492  2641 0

c  1+1 --> 2
c    (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0 ∧  p_492) -> (-b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0)
c  in CNF:
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_2
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨  b^{1, 493}_1
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ -p_492 ∨ -b^{1, 493}_0
c  in DIMACS:
 2636  2637 -2638 -492 -2639 0
 2636  2637 -2638 -492  2640 0
 2636  2637 -2638 -492 -2641 0

c  2+1 --> break 
c    (-b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧  p_492) -> break
c  in CNF:
c     b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 2636 -2637  2638 -492 1162 0


c  2-1 --> 1
c    (-b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧ -p_492) -> (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0)
c  in CNF:
c     b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_2
c     b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_1
c     b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨  b^{1, 493}_0
c  in DIMACS:
 2636 -2637  2638  492 -2639 0
 2636 -2637  2638  492 -2640 0
 2636 -2637  2638  492  2641 0

c  1-1 --> 0
c    (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0 ∧ -p_492) -> (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧ -b^{1, 493}_0)
c  in CNF:
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_2
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_1
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_0
c  in DIMACS:
 2636  2637 -2638  492 -2639 0
 2636  2637 -2638  492 -2640 0
 2636  2637 -2638  492 -2641 0

c  0-1 --> -1
c    (-b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧ -p_492) -> ( b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0)
c  in CNF:
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨  b^{1, 493}_2
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_1
c     b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨  b^{1, 493}_0
c  in DIMACS:
 2636  2637  2638  492  2639 0
 2636  2637  2638  492 -2640 0
 2636  2637  2638  492  2641 0

c  -1-1 --> -2
c    ( b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧  b^{1, 492}_0 ∧ -p_492) -> ( b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0)
c  in CNF:
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨  b^{1, 493}_2
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨  b^{1, 493}_1
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨  p_492 ∨ -b^{1, 493}_0
c  in DIMACS:
-2636  2637 -2638  492  2639 0
-2636  2637 -2638  492  2640 0
-2636  2637 -2638  492 -2641 0

c  -2-1 --> break 
c    ( b^{1, 492}_2 ∧  b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨  b^{1, 492}_0 ∨  p_492 ∨ break
c  in DIMACS:
-2636 -2637  2638  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 492}_2 ∧ -b^{1, 492}_1 ∧ -b^{1, 492}_0 ∧ true) 
c  in CNF:
c    -b^{1, 492}_2 ∨  b^{1, 492}_1 ∨  b^{1, 492}_0 ∨ false 
c  in DIMACS:
-2636  2637  2638  0

c  3 does not represent an automaton state.
c    -(-b^{1, 492}_2 ∧  b^{1, 492}_1 ∧  b^{1, 492}_0 ∧ true) 
c  in CNF:
c     b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ false 
c  in DIMACS:
 2636 -2637 -2638  0
c  -3 does not represent an automaton state.
c    -( b^{1, 492}_2 ∧  b^{1, 492}_1 ∧  b^{1, 492}_0 ∧ true) 
c  in CNF:
c    -b^{1, 492}_2 ∨ -b^{1, 492}_1 ∨ -b^{1, 492}_0 ∨ false 
c  in DIMACS:
-2636 -2637 -2638  0

c i = 493
c  -2+1 --> -1
c    ( b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧  p_493) -> ( b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0)
c  in CNF:
c    -b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨  b^{1, 494}_2
c    -b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_1
c    -b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨  b^{1, 494}_0
c  in DIMACS:
-2639 -2640  2641 -493  2642 0
-2639 -2640  2641 -493 -2643 0
-2639 -2640  2641 -493  2644 0

c  -1+1 --> 0
c    ( b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0 ∧  p_493) -> (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧ -b^{1, 494}_0)
c  in CNF:
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_2
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_1
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_0
c  in DIMACS:
-2639  2640 -2641 -493 -2642 0
-2639  2640 -2641 -493 -2643 0
-2639  2640 -2641 -493 -2644 0

c  0+1 --> 1
c    (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧  p_493) -> (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0)
c  in CNF:
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_2
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_1
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨  b^{1, 494}_0
c  in DIMACS:
 2639  2640  2641 -493 -2642 0
 2639  2640  2641 -493 -2643 0
 2639  2640  2641 -493  2644 0

c  1+1 --> 2
c    (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0 ∧  p_493) -> (-b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0)
c  in CNF:
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_2
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨  b^{1, 494}_1
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ -p_493 ∨ -b^{1, 494}_0
c  in DIMACS:
 2639  2640 -2641 -493 -2642 0
 2639  2640 -2641 -493  2643 0
 2639  2640 -2641 -493 -2644 0

c  2+1 --> break 
c    (-b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧  p_493) -> break
c  in CNF:
c     b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ -p_493 ∨ break
c  in DIMACS:
 2639 -2640  2641 -493 1162 0


c  2-1 --> 1
c    (-b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧ -p_493) -> (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0)
c  in CNF:
c     b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_2
c     b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_1
c     b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨  b^{1, 494}_0
c  in DIMACS:
 2639 -2640  2641  493 -2642 0
 2639 -2640  2641  493 -2643 0
 2639 -2640  2641  493  2644 0

c  1-1 --> 0
c    (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0 ∧ -p_493) -> (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧ -b^{1, 494}_0)
c  in CNF:
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_2
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_1
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_0
c  in DIMACS:
 2639  2640 -2641  493 -2642 0
 2639  2640 -2641  493 -2643 0
 2639  2640 -2641  493 -2644 0

c  0-1 --> -1
c    (-b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧ -p_493) -> ( b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0)
c  in CNF:
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨  b^{1, 494}_2
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_1
c     b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨  b^{1, 494}_0
c  in DIMACS:
 2639  2640  2641  493  2642 0
 2639  2640  2641  493 -2643 0
 2639  2640  2641  493  2644 0

c  -1-1 --> -2
c    ( b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧  b^{1, 493}_0 ∧ -p_493) -> ( b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0)
c  in CNF:
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨  b^{1, 494}_2
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨  b^{1, 494}_1
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨  p_493 ∨ -b^{1, 494}_0
c  in DIMACS:
-2639  2640 -2641  493  2642 0
-2639  2640 -2641  493  2643 0
-2639  2640 -2641  493 -2644 0

c  -2-1 --> break 
c    ( b^{1, 493}_2 ∧  b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧ -p_493) -> break
c  in CNF:
c    -b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨  b^{1, 493}_0 ∨  p_493 ∨ break
c  in DIMACS:
-2639 -2640  2641  493 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 493}_2 ∧ -b^{1, 493}_1 ∧ -b^{1, 493}_0 ∧ true) 
c  in CNF:
c    -b^{1, 493}_2 ∨  b^{1, 493}_1 ∨  b^{1, 493}_0 ∨ false 
c  in DIMACS:
-2639  2640  2641  0

c  3 does not represent an automaton state.
c    -(-b^{1, 493}_2 ∧  b^{1, 493}_1 ∧  b^{1, 493}_0 ∧ true) 
c  in CNF:
c     b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ false 
c  in DIMACS:
 2639 -2640 -2641  0
c  -3 does not represent an automaton state.
c    -( b^{1, 493}_2 ∧  b^{1, 493}_1 ∧  b^{1, 493}_0 ∧ true) 
c  in CNF:
c    -b^{1, 493}_2 ∨ -b^{1, 493}_1 ∨ -b^{1, 493}_0 ∨ false 
c  in DIMACS:
-2639 -2640 -2641  0

c i = 494
c  -2+1 --> -1
c    ( b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧  p_494) -> ( b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0)
c  in CNF:
c    -b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨  b^{1, 495}_2
c    -b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_1
c    -b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨  b^{1, 495}_0
c  in DIMACS:
-2642 -2643  2644 -494  2645 0
-2642 -2643  2644 -494 -2646 0
-2642 -2643  2644 -494  2647 0

c  -1+1 --> 0
c    ( b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0 ∧  p_494) -> (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧ -b^{1, 495}_0)
c  in CNF:
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_2
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_1
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_0
c  in DIMACS:
-2642  2643 -2644 -494 -2645 0
-2642  2643 -2644 -494 -2646 0
-2642  2643 -2644 -494 -2647 0

c  0+1 --> 1
c    (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧  p_494) -> (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0)
c  in CNF:
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_2
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_1
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨  b^{1, 495}_0
c  in DIMACS:
 2642  2643  2644 -494 -2645 0
 2642  2643  2644 -494 -2646 0
 2642  2643  2644 -494  2647 0

c  1+1 --> 2
c    (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0 ∧  p_494) -> (-b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0)
c  in CNF:
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_2
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨  b^{1, 495}_1
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ -p_494 ∨ -b^{1, 495}_0
c  in DIMACS:
 2642  2643 -2644 -494 -2645 0
 2642  2643 -2644 -494  2646 0
 2642  2643 -2644 -494 -2647 0

c  2+1 --> break 
c    (-b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧  p_494) -> break
c  in CNF:
c     b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 2642 -2643  2644 -494 1162 0


c  2-1 --> 1
c    (-b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧ -p_494) -> (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0)
c  in CNF:
c     b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_2
c     b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_1
c     b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨  b^{1, 495}_0
c  in DIMACS:
 2642 -2643  2644  494 -2645 0
 2642 -2643  2644  494 -2646 0
 2642 -2643  2644  494  2647 0

c  1-1 --> 0
c    (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0 ∧ -p_494) -> (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧ -b^{1, 495}_0)
c  in CNF:
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_2
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_1
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_0
c  in DIMACS:
 2642  2643 -2644  494 -2645 0
 2642  2643 -2644  494 -2646 0
 2642  2643 -2644  494 -2647 0

c  0-1 --> -1
c    (-b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧ -p_494) -> ( b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0)
c  in CNF:
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨  b^{1, 495}_2
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_1
c     b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨  b^{1, 495}_0
c  in DIMACS:
 2642  2643  2644  494  2645 0
 2642  2643  2644  494 -2646 0
 2642  2643  2644  494  2647 0

c  -1-1 --> -2
c    ( b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧  b^{1, 494}_0 ∧ -p_494) -> ( b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0)
c  in CNF:
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨  b^{1, 495}_2
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨  b^{1, 495}_1
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨  p_494 ∨ -b^{1, 495}_0
c  in DIMACS:
-2642  2643 -2644  494  2645 0
-2642  2643 -2644  494  2646 0
-2642  2643 -2644  494 -2647 0

c  -2-1 --> break 
c    ( b^{1, 494}_2 ∧  b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨  b^{1, 494}_0 ∨  p_494 ∨ break
c  in DIMACS:
-2642 -2643  2644  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 494}_2 ∧ -b^{1, 494}_1 ∧ -b^{1, 494}_0 ∧ true) 
c  in CNF:
c    -b^{1, 494}_2 ∨  b^{1, 494}_1 ∨  b^{1, 494}_0 ∨ false 
c  in DIMACS:
-2642  2643  2644  0

c  3 does not represent an automaton state.
c    -(-b^{1, 494}_2 ∧  b^{1, 494}_1 ∧  b^{1, 494}_0 ∧ true) 
c  in CNF:
c     b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ false 
c  in DIMACS:
 2642 -2643 -2644  0
c  -3 does not represent an automaton state.
c    -( b^{1, 494}_2 ∧  b^{1, 494}_1 ∧  b^{1, 494}_0 ∧ true) 
c  in CNF:
c    -b^{1, 494}_2 ∨ -b^{1, 494}_1 ∨ -b^{1, 494}_0 ∨ false 
c  in DIMACS:
-2642 -2643 -2644  0

c i = 495
c  -2+1 --> -1
c    ( b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧  p_495) -> ( b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0)
c  in CNF:
c    -b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨  b^{1, 496}_2
c    -b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_1
c    -b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨  b^{1, 496}_0
c  in DIMACS:
-2645 -2646  2647 -495  2648 0
-2645 -2646  2647 -495 -2649 0
-2645 -2646  2647 -495  2650 0

c  -1+1 --> 0
c    ( b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0 ∧  p_495) -> (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧ -b^{1, 496}_0)
c  in CNF:
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_2
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_1
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_0
c  in DIMACS:
-2645  2646 -2647 -495 -2648 0
-2645  2646 -2647 -495 -2649 0
-2645  2646 -2647 -495 -2650 0

c  0+1 --> 1
c    (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧  p_495) -> (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0)
c  in CNF:
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_2
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_1
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨  b^{1, 496}_0
c  in DIMACS:
 2645  2646  2647 -495 -2648 0
 2645  2646  2647 -495 -2649 0
 2645  2646  2647 -495  2650 0

c  1+1 --> 2
c    (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0 ∧  p_495) -> (-b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0)
c  in CNF:
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_2
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨  b^{1, 496}_1
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ -p_495 ∨ -b^{1, 496}_0
c  in DIMACS:
 2645  2646 -2647 -495 -2648 0
 2645  2646 -2647 -495  2649 0
 2645  2646 -2647 -495 -2650 0

c  2+1 --> break 
c    (-b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧  p_495) -> break
c  in CNF:
c     b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 2645 -2646  2647 -495 1162 0


c  2-1 --> 1
c    (-b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧ -p_495) -> (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0)
c  in CNF:
c     b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_2
c     b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_1
c     b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨  b^{1, 496}_0
c  in DIMACS:
 2645 -2646  2647  495 -2648 0
 2645 -2646  2647  495 -2649 0
 2645 -2646  2647  495  2650 0

c  1-1 --> 0
c    (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0 ∧ -p_495) -> (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧ -b^{1, 496}_0)
c  in CNF:
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_2
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_1
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_0
c  in DIMACS:
 2645  2646 -2647  495 -2648 0
 2645  2646 -2647  495 -2649 0
 2645  2646 -2647  495 -2650 0

c  0-1 --> -1
c    (-b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧ -p_495) -> ( b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0)
c  in CNF:
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨  b^{1, 496}_2
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_1
c     b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨  b^{1, 496}_0
c  in DIMACS:
 2645  2646  2647  495  2648 0
 2645  2646  2647  495 -2649 0
 2645  2646  2647  495  2650 0

c  -1-1 --> -2
c    ( b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧  b^{1, 495}_0 ∧ -p_495) -> ( b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0)
c  in CNF:
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨  b^{1, 496}_2
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨  b^{1, 496}_1
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨  p_495 ∨ -b^{1, 496}_0
c  in DIMACS:
-2645  2646 -2647  495  2648 0
-2645  2646 -2647  495  2649 0
-2645  2646 -2647  495 -2650 0

c  -2-1 --> break 
c    ( b^{1, 495}_2 ∧  b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨  b^{1, 495}_0 ∨  p_495 ∨ break
c  in DIMACS:
-2645 -2646  2647  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 495}_2 ∧ -b^{1, 495}_1 ∧ -b^{1, 495}_0 ∧ true) 
c  in CNF:
c    -b^{1, 495}_2 ∨  b^{1, 495}_1 ∨  b^{1, 495}_0 ∨ false 
c  in DIMACS:
-2645  2646  2647  0

c  3 does not represent an automaton state.
c    -(-b^{1, 495}_2 ∧  b^{1, 495}_1 ∧  b^{1, 495}_0 ∧ true) 
c  in CNF:
c     b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ false 
c  in DIMACS:
 2645 -2646 -2647  0
c  -3 does not represent an automaton state.
c    -( b^{1, 495}_2 ∧  b^{1, 495}_1 ∧  b^{1, 495}_0 ∧ true) 
c  in CNF:
c    -b^{1, 495}_2 ∨ -b^{1, 495}_1 ∨ -b^{1, 495}_0 ∨ false 
c  in DIMACS:
-2645 -2646 -2647  0

c i = 496
c  -2+1 --> -1
c    ( b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧  p_496) -> ( b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0)
c  in CNF:
c    -b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨  b^{1, 497}_2
c    -b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_1
c    -b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨  b^{1, 497}_0
c  in DIMACS:
-2648 -2649  2650 -496  2651 0
-2648 -2649  2650 -496 -2652 0
-2648 -2649  2650 -496  2653 0

c  -1+1 --> 0
c    ( b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0 ∧  p_496) -> (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧ -b^{1, 497}_0)
c  in CNF:
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_2
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_1
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_0
c  in DIMACS:
-2648  2649 -2650 -496 -2651 0
-2648  2649 -2650 -496 -2652 0
-2648  2649 -2650 -496 -2653 0

c  0+1 --> 1
c    (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧  p_496) -> (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0)
c  in CNF:
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_2
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_1
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨  b^{1, 497}_0
c  in DIMACS:
 2648  2649  2650 -496 -2651 0
 2648  2649  2650 -496 -2652 0
 2648  2649  2650 -496  2653 0

c  1+1 --> 2
c    (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0 ∧  p_496) -> (-b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0)
c  in CNF:
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_2
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨  b^{1, 497}_1
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ -p_496 ∨ -b^{1, 497}_0
c  in DIMACS:
 2648  2649 -2650 -496 -2651 0
 2648  2649 -2650 -496  2652 0
 2648  2649 -2650 -496 -2653 0

c  2+1 --> break 
c    (-b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧  p_496) -> break
c  in CNF:
c     b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 2648 -2649  2650 -496 1162 0


c  2-1 --> 1
c    (-b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧ -p_496) -> (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0)
c  in CNF:
c     b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_2
c     b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_1
c     b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨  b^{1, 497}_0
c  in DIMACS:
 2648 -2649  2650  496 -2651 0
 2648 -2649  2650  496 -2652 0
 2648 -2649  2650  496  2653 0

c  1-1 --> 0
c    (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0 ∧ -p_496) -> (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧ -b^{1, 497}_0)
c  in CNF:
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_2
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_1
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_0
c  in DIMACS:
 2648  2649 -2650  496 -2651 0
 2648  2649 -2650  496 -2652 0
 2648  2649 -2650  496 -2653 0

c  0-1 --> -1
c    (-b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧ -p_496) -> ( b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0)
c  in CNF:
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨  b^{1, 497}_2
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_1
c     b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨  b^{1, 497}_0
c  in DIMACS:
 2648  2649  2650  496  2651 0
 2648  2649  2650  496 -2652 0
 2648  2649  2650  496  2653 0

c  -1-1 --> -2
c    ( b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧  b^{1, 496}_0 ∧ -p_496) -> ( b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0)
c  in CNF:
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨  b^{1, 497}_2
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨  b^{1, 497}_1
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨  p_496 ∨ -b^{1, 497}_0
c  in DIMACS:
-2648  2649 -2650  496  2651 0
-2648  2649 -2650  496  2652 0
-2648  2649 -2650  496 -2653 0

c  -2-1 --> break 
c    ( b^{1, 496}_2 ∧  b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨  b^{1, 496}_0 ∨  p_496 ∨ break
c  in DIMACS:
-2648 -2649  2650  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 496}_2 ∧ -b^{1, 496}_1 ∧ -b^{1, 496}_0 ∧ true) 
c  in CNF:
c    -b^{1, 496}_2 ∨  b^{1, 496}_1 ∨  b^{1, 496}_0 ∨ false 
c  in DIMACS:
-2648  2649  2650  0

c  3 does not represent an automaton state.
c    -(-b^{1, 496}_2 ∧  b^{1, 496}_1 ∧  b^{1, 496}_0 ∧ true) 
c  in CNF:
c     b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ false 
c  in DIMACS:
 2648 -2649 -2650  0
c  -3 does not represent an automaton state.
c    -( b^{1, 496}_2 ∧  b^{1, 496}_1 ∧  b^{1, 496}_0 ∧ true) 
c  in CNF:
c    -b^{1, 496}_2 ∨ -b^{1, 496}_1 ∨ -b^{1, 496}_0 ∨ false 
c  in DIMACS:
-2648 -2649 -2650  0

c i = 497
c  -2+1 --> -1
c    ( b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧  p_497) -> ( b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0)
c  in CNF:
c    -b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨  b^{1, 498}_2
c    -b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_1
c    -b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨  b^{1, 498}_0
c  in DIMACS:
-2651 -2652  2653 -497  2654 0
-2651 -2652  2653 -497 -2655 0
-2651 -2652  2653 -497  2656 0

c  -1+1 --> 0
c    ( b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0 ∧  p_497) -> (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧ -b^{1, 498}_0)
c  in CNF:
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_2
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_1
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_0
c  in DIMACS:
-2651  2652 -2653 -497 -2654 0
-2651  2652 -2653 -497 -2655 0
-2651  2652 -2653 -497 -2656 0

c  0+1 --> 1
c    (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧  p_497) -> (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0)
c  in CNF:
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_2
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_1
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨  b^{1, 498}_0
c  in DIMACS:
 2651  2652  2653 -497 -2654 0
 2651  2652  2653 -497 -2655 0
 2651  2652  2653 -497  2656 0

c  1+1 --> 2
c    (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0 ∧  p_497) -> (-b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0)
c  in CNF:
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_2
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨  b^{1, 498}_1
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ -p_497 ∨ -b^{1, 498}_0
c  in DIMACS:
 2651  2652 -2653 -497 -2654 0
 2651  2652 -2653 -497  2655 0
 2651  2652 -2653 -497 -2656 0

c  2+1 --> break 
c    (-b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧  p_497) -> break
c  in CNF:
c     b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ -p_497 ∨ break
c  in DIMACS:
 2651 -2652  2653 -497 1162 0


c  2-1 --> 1
c    (-b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧ -p_497) -> (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0)
c  in CNF:
c     b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_2
c     b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_1
c     b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨  b^{1, 498}_0
c  in DIMACS:
 2651 -2652  2653  497 -2654 0
 2651 -2652  2653  497 -2655 0
 2651 -2652  2653  497  2656 0

c  1-1 --> 0
c    (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0 ∧ -p_497) -> (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧ -b^{1, 498}_0)
c  in CNF:
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_2
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_1
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_0
c  in DIMACS:
 2651  2652 -2653  497 -2654 0
 2651  2652 -2653  497 -2655 0
 2651  2652 -2653  497 -2656 0

c  0-1 --> -1
c    (-b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧ -p_497) -> ( b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0)
c  in CNF:
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨  b^{1, 498}_2
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_1
c     b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨  b^{1, 498}_0
c  in DIMACS:
 2651  2652  2653  497  2654 0
 2651  2652  2653  497 -2655 0
 2651  2652  2653  497  2656 0

c  -1-1 --> -2
c    ( b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧  b^{1, 497}_0 ∧ -p_497) -> ( b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0)
c  in CNF:
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨  b^{1, 498}_2
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨  b^{1, 498}_1
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨  p_497 ∨ -b^{1, 498}_0
c  in DIMACS:
-2651  2652 -2653  497  2654 0
-2651  2652 -2653  497  2655 0
-2651  2652 -2653  497 -2656 0

c  -2-1 --> break 
c    ( b^{1, 497}_2 ∧  b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧ -p_497) -> break
c  in CNF:
c    -b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨  b^{1, 497}_0 ∨  p_497 ∨ break
c  in DIMACS:
-2651 -2652  2653  497 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 497}_2 ∧ -b^{1, 497}_1 ∧ -b^{1, 497}_0 ∧ true) 
c  in CNF:
c    -b^{1, 497}_2 ∨  b^{1, 497}_1 ∨  b^{1, 497}_0 ∨ false 
c  in DIMACS:
-2651  2652  2653  0

c  3 does not represent an automaton state.
c    -(-b^{1, 497}_2 ∧  b^{1, 497}_1 ∧  b^{1, 497}_0 ∧ true) 
c  in CNF:
c     b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ false 
c  in DIMACS:
 2651 -2652 -2653  0
c  -3 does not represent an automaton state.
c    -( b^{1, 497}_2 ∧  b^{1, 497}_1 ∧  b^{1, 497}_0 ∧ true) 
c  in CNF:
c    -b^{1, 497}_2 ∨ -b^{1, 497}_1 ∨ -b^{1, 497}_0 ∨ false 
c  in DIMACS:
-2651 -2652 -2653  0

c i = 498
c  -2+1 --> -1
c    ( b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧  p_498) -> ( b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0)
c  in CNF:
c    -b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨  b^{1, 499}_2
c    -b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_1
c    -b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨  b^{1, 499}_0
c  in DIMACS:
-2654 -2655  2656 -498  2657 0
-2654 -2655  2656 -498 -2658 0
-2654 -2655  2656 -498  2659 0

c  -1+1 --> 0
c    ( b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0 ∧  p_498) -> (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧ -b^{1, 499}_0)
c  in CNF:
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_2
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_1
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_0
c  in DIMACS:
-2654  2655 -2656 -498 -2657 0
-2654  2655 -2656 -498 -2658 0
-2654  2655 -2656 -498 -2659 0

c  0+1 --> 1
c    (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧  p_498) -> (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0)
c  in CNF:
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_2
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_1
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨  b^{1, 499}_0
c  in DIMACS:
 2654  2655  2656 -498 -2657 0
 2654  2655  2656 -498 -2658 0
 2654  2655  2656 -498  2659 0

c  1+1 --> 2
c    (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0 ∧  p_498) -> (-b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0)
c  in CNF:
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_2
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨  b^{1, 499}_1
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ -p_498 ∨ -b^{1, 499}_0
c  in DIMACS:
 2654  2655 -2656 -498 -2657 0
 2654  2655 -2656 -498  2658 0
 2654  2655 -2656 -498 -2659 0

c  2+1 --> break 
c    (-b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧  p_498) -> break
c  in CNF:
c     b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 2654 -2655  2656 -498 1162 0


c  2-1 --> 1
c    (-b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧ -p_498) -> (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0)
c  in CNF:
c     b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_2
c     b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_1
c     b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨  b^{1, 499}_0
c  in DIMACS:
 2654 -2655  2656  498 -2657 0
 2654 -2655  2656  498 -2658 0
 2654 -2655  2656  498  2659 0

c  1-1 --> 0
c    (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0 ∧ -p_498) -> (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧ -b^{1, 499}_0)
c  in CNF:
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_2
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_1
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_0
c  in DIMACS:
 2654  2655 -2656  498 -2657 0
 2654  2655 -2656  498 -2658 0
 2654  2655 -2656  498 -2659 0

c  0-1 --> -1
c    (-b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧ -p_498) -> ( b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0)
c  in CNF:
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨  b^{1, 499}_2
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_1
c     b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨  b^{1, 499}_0
c  in DIMACS:
 2654  2655  2656  498  2657 0
 2654  2655  2656  498 -2658 0
 2654  2655  2656  498  2659 0

c  -1-1 --> -2
c    ( b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧  b^{1, 498}_0 ∧ -p_498) -> ( b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0)
c  in CNF:
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨  b^{1, 499}_2
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨  b^{1, 499}_1
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨  p_498 ∨ -b^{1, 499}_0
c  in DIMACS:
-2654  2655 -2656  498  2657 0
-2654  2655 -2656  498  2658 0
-2654  2655 -2656  498 -2659 0

c  -2-1 --> break 
c    ( b^{1, 498}_2 ∧  b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨  b^{1, 498}_0 ∨  p_498 ∨ break
c  in DIMACS:
-2654 -2655  2656  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 498}_2 ∧ -b^{1, 498}_1 ∧ -b^{1, 498}_0 ∧ true) 
c  in CNF:
c    -b^{1, 498}_2 ∨  b^{1, 498}_1 ∨  b^{1, 498}_0 ∨ false 
c  in DIMACS:
-2654  2655  2656  0

c  3 does not represent an automaton state.
c    -(-b^{1, 498}_2 ∧  b^{1, 498}_1 ∧  b^{1, 498}_0 ∧ true) 
c  in CNF:
c     b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ false 
c  in DIMACS:
 2654 -2655 -2656  0
c  -3 does not represent an automaton state.
c    -( b^{1, 498}_2 ∧  b^{1, 498}_1 ∧  b^{1, 498}_0 ∧ true) 
c  in CNF:
c    -b^{1, 498}_2 ∨ -b^{1, 498}_1 ∨ -b^{1, 498}_0 ∨ false 
c  in DIMACS:
-2654 -2655 -2656  0

c i = 499
c  -2+1 --> -1
c    ( b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧  p_499) -> ( b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0)
c  in CNF:
c    -b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨  b^{1, 500}_2
c    -b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_1
c    -b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨  b^{1, 500}_0
c  in DIMACS:
-2657 -2658  2659 -499  2660 0
-2657 -2658  2659 -499 -2661 0
-2657 -2658  2659 -499  2662 0

c  -1+1 --> 0
c    ( b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0 ∧  p_499) -> (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧ -b^{1, 500}_0)
c  in CNF:
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_2
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_1
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_0
c  in DIMACS:
-2657  2658 -2659 -499 -2660 0
-2657  2658 -2659 -499 -2661 0
-2657  2658 -2659 -499 -2662 0

c  0+1 --> 1
c    (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧  p_499) -> (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0)
c  in CNF:
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_2
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_1
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨  b^{1, 500}_0
c  in DIMACS:
 2657  2658  2659 -499 -2660 0
 2657  2658  2659 -499 -2661 0
 2657  2658  2659 -499  2662 0

c  1+1 --> 2
c    (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0 ∧  p_499) -> (-b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0)
c  in CNF:
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_2
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨  b^{1, 500}_1
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ -p_499 ∨ -b^{1, 500}_0
c  in DIMACS:
 2657  2658 -2659 -499 -2660 0
 2657  2658 -2659 -499  2661 0
 2657  2658 -2659 -499 -2662 0

c  2+1 --> break 
c    (-b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧  p_499) -> break
c  in CNF:
c     b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ -p_499 ∨ break
c  in DIMACS:
 2657 -2658  2659 -499 1162 0


c  2-1 --> 1
c    (-b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧ -p_499) -> (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0)
c  in CNF:
c     b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_2
c     b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_1
c     b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨  b^{1, 500}_0
c  in DIMACS:
 2657 -2658  2659  499 -2660 0
 2657 -2658  2659  499 -2661 0
 2657 -2658  2659  499  2662 0

c  1-1 --> 0
c    (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0 ∧ -p_499) -> (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧ -b^{1, 500}_0)
c  in CNF:
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_2
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_1
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_0
c  in DIMACS:
 2657  2658 -2659  499 -2660 0
 2657  2658 -2659  499 -2661 0
 2657  2658 -2659  499 -2662 0

c  0-1 --> -1
c    (-b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧ -p_499) -> ( b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0)
c  in CNF:
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨  b^{1, 500}_2
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_1
c     b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨  b^{1, 500}_0
c  in DIMACS:
 2657  2658  2659  499  2660 0
 2657  2658  2659  499 -2661 0
 2657  2658  2659  499  2662 0

c  -1-1 --> -2
c    ( b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧  b^{1, 499}_0 ∧ -p_499) -> ( b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0)
c  in CNF:
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨  b^{1, 500}_2
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨  b^{1, 500}_1
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨  p_499 ∨ -b^{1, 500}_0
c  in DIMACS:
-2657  2658 -2659  499  2660 0
-2657  2658 -2659  499  2661 0
-2657  2658 -2659  499 -2662 0

c  -2-1 --> break 
c    ( b^{1, 499}_2 ∧  b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧ -p_499) -> break
c  in CNF:
c    -b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨  b^{1, 499}_0 ∨  p_499 ∨ break
c  in DIMACS:
-2657 -2658  2659  499 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 499}_2 ∧ -b^{1, 499}_1 ∧ -b^{1, 499}_0 ∧ true) 
c  in CNF:
c    -b^{1, 499}_2 ∨  b^{1, 499}_1 ∨  b^{1, 499}_0 ∨ false 
c  in DIMACS:
-2657  2658  2659  0

c  3 does not represent an automaton state.
c    -(-b^{1, 499}_2 ∧  b^{1, 499}_1 ∧  b^{1, 499}_0 ∧ true) 
c  in CNF:
c     b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ false 
c  in DIMACS:
 2657 -2658 -2659  0
c  -3 does not represent an automaton state.
c    -( b^{1, 499}_2 ∧  b^{1, 499}_1 ∧  b^{1, 499}_0 ∧ true) 
c  in CNF:
c    -b^{1, 499}_2 ∨ -b^{1, 499}_1 ∨ -b^{1, 499}_0 ∨ false 
c  in DIMACS:
-2657 -2658 -2659  0

c i = 500
c  -2+1 --> -1
c    ( b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧  p_500) -> ( b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0)
c  in CNF:
c    -b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨  b^{1, 501}_2
c    -b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_1
c    -b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨  b^{1, 501}_0
c  in DIMACS:
-2660 -2661  2662 -500  2663 0
-2660 -2661  2662 -500 -2664 0
-2660 -2661  2662 -500  2665 0

c  -1+1 --> 0
c    ( b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0 ∧  p_500) -> (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧ -b^{1, 501}_0)
c  in CNF:
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_2
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_1
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_0
c  in DIMACS:
-2660  2661 -2662 -500 -2663 0
-2660  2661 -2662 -500 -2664 0
-2660  2661 -2662 -500 -2665 0

c  0+1 --> 1
c    (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧  p_500) -> (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0)
c  in CNF:
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_2
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_1
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨  b^{1, 501}_0
c  in DIMACS:
 2660  2661  2662 -500 -2663 0
 2660  2661  2662 -500 -2664 0
 2660  2661  2662 -500  2665 0

c  1+1 --> 2
c    (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0 ∧  p_500) -> (-b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0)
c  in CNF:
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_2
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨  b^{1, 501}_1
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ -p_500 ∨ -b^{1, 501}_0
c  in DIMACS:
 2660  2661 -2662 -500 -2663 0
 2660  2661 -2662 -500  2664 0
 2660  2661 -2662 -500 -2665 0

c  2+1 --> break 
c    (-b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧  p_500) -> break
c  in CNF:
c     b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 2660 -2661  2662 -500 1162 0


c  2-1 --> 1
c    (-b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧ -p_500) -> (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0)
c  in CNF:
c     b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_2
c     b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_1
c     b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨  b^{1, 501}_0
c  in DIMACS:
 2660 -2661  2662  500 -2663 0
 2660 -2661  2662  500 -2664 0
 2660 -2661  2662  500  2665 0

c  1-1 --> 0
c    (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0 ∧ -p_500) -> (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧ -b^{1, 501}_0)
c  in CNF:
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_2
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_1
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_0
c  in DIMACS:
 2660  2661 -2662  500 -2663 0
 2660  2661 -2662  500 -2664 0
 2660  2661 -2662  500 -2665 0

c  0-1 --> -1
c    (-b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧ -p_500) -> ( b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0)
c  in CNF:
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨  b^{1, 501}_2
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_1
c     b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨  b^{1, 501}_0
c  in DIMACS:
 2660  2661  2662  500  2663 0
 2660  2661  2662  500 -2664 0
 2660  2661  2662  500  2665 0

c  -1-1 --> -2
c    ( b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧  b^{1, 500}_0 ∧ -p_500) -> ( b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0)
c  in CNF:
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨  b^{1, 501}_2
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨  b^{1, 501}_1
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨  p_500 ∨ -b^{1, 501}_0
c  in DIMACS:
-2660  2661 -2662  500  2663 0
-2660  2661 -2662  500  2664 0
-2660  2661 -2662  500 -2665 0

c  -2-1 --> break 
c    ( b^{1, 500}_2 ∧  b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨  b^{1, 500}_0 ∨  p_500 ∨ break
c  in DIMACS:
-2660 -2661  2662  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 500}_2 ∧ -b^{1, 500}_1 ∧ -b^{1, 500}_0 ∧ true) 
c  in CNF:
c    -b^{1, 500}_2 ∨  b^{1, 500}_1 ∨  b^{1, 500}_0 ∨ false 
c  in DIMACS:
-2660  2661  2662  0

c  3 does not represent an automaton state.
c    -(-b^{1, 500}_2 ∧  b^{1, 500}_1 ∧  b^{1, 500}_0 ∧ true) 
c  in CNF:
c     b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ false 
c  in DIMACS:
 2660 -2661 -2662  0
c  -3 does not represent an automaton state.
c    -( b^{1, 500}_2 ∧  b^{1, 500}_1 ∧  b^{1, 500}_0 ∧ true) 
c  in CNF:
c    -b^{1, 500}_2 ∨ -b^{1, 500}_1 ∨ -b^{1, 500}_0 ∨ false 
c  in DIMACS:
-2660 -2661 -2662  0

c i = 501
c  -2+1 --> -1
c    ( b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧  p_501) -> ( b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0)
c  in CNF:
c    -b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨  b^{1, 502}_2
c    -b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_1
c    -b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨  b^{1, 502}_0
c  in DIMACS:
-2663 -2664  2665 -501  2666 0
-2663 -2664  2665 -501 -2667 0
-2663 -2664  2665 -501  2668 0

c  -1+1 --> 0
c    ( b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0 ∧  p_501) -> (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧ -b^{1, 502}_0)
c  in CNF:
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_2
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_1
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_0
c  in DIMACS:
-2663  2664 -2665 -501 -2666 0
-2663  2664 -2665 -501 -2667 0
-2663  2664 -2665 -501 -2668 0

c  0+1 --> 1
c    (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧  p_501) -> (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0)
c  in CNF:
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_2
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_1
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨  b^{1, 502}_0
c  in DIMACS:
 2663  2664  2665 -501 -2666 0
 2663  2664  2665 -501 -2667 0
 2663  2664  2665 -501  2668 0

c  1+1 --> 2
c    (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0 ∧  p_501) -> (-b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0)
c  in CNF:
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_2
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨  b^{1, 502}_1
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ -p_501 ∨ -b^{1, 502}_0
c  in DIMACS:
 2663  2664 -2665 -501 -2666 0
 2663  2664 -2665 -501  2667 0
 2663  2664 -2665 -501 -2668 0

c  2+1 --> break 
c    (-b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧  p_501) -> break
c  in CNF:
c     b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ -p_501 ∨ break
c  in DIMACS:
 2663 -2664  2665 -501 1162 0


c  2-1 --> 1
c    (-b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧ -p_501) -> (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0)
c  in CNF:
c     b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_2
c     b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_1
c     b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨  b^{1, 502}_0
c  in DIMACS:
 2663 -2664  2665  501 -2666 0
 2663 -2664  2665  501 -2667 0
 2663 -2664  2665  501  2668 0

c  1-1 --> 0
c    (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0 ∧ -p_501) -> (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧ -b^{1, 502}_0)
c  in CNF:
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_2
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_1
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_0
c  in DIMACS:
 2663  2664 -2665  501 -2666 0
 2663  2664 -2665  501 -2667 0
 2663  2664 -2665  501 -2668 0

c  0-1 --> -1
c    (-b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧ -p_501) -> ( b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0)
c  in CNF:
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨  b^{1, 502}_2
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_1
c     b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨  b^{1, 502}_0
c  in DIMACS:
 2663  2664  2665  501  2666 0
 2663  2664  2665  501 -2667 0
 2663  2664  2665  501  2668 0

c  -1-1 --> -2
c    ( b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧  b^{1, 501}_0 ∧ -p_501) -> ( b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0)
c  in CNF:
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨  b^{1, 502}_2
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨  b^{1, 502}_1
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨  p_501 ∨ -b^{1, 502}_0
c  in DIMACS:
-2663  2664 -2665  501  2666 0
-2663  2664 -2665  501  2667 0
-2663  2664 -2665  501 -2668 0

c  -2-1 --> break 
c    ( b^{1, 501}_2 ∧  b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧ -p_501) -> break
c  in CNF:
c    -b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨  b^{1, 501}_0 ∨  p_501 ∨ break
c  in DIMACS:
-2663 -2664  2665  501 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 501}_2 ∧ -b^{1, 501}_1 ∧ -b^{1, 501}_0 ∧ true) 
c  in CNF:
c    -b^{1, 501}_2 ∨  b^{1, 501}_1 ∨  b^{1, 501}_0 ∨ false 
c  in DIMACS:
-2663  2664  2665  0

c  3 does not represent an automaton state.
c    -(-b^{1, 501}_2 ∧  b^{1, 501}_1 ∧  b^{1, 501}_0 ∧ true) 
c  in CNF:
c     b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ false 
c  in DIMACS:
 2663 -2664 -2665  0
c  -3 does not represent an automaton state.
c    -( b^{1, 501}_2 ∧  b^{1, 501}_1 ∧  b^{1, 501}_0 ∧ true) 
c  in CNF:
c    -b^{1, 501}_2 ∨ -b^{1, 501}_1 ∨ -b^{1, 501}_0 ∨ false 
c  in DIMACS:
-2663 -2664 -2665  0

c i = 502
c  -2+1 --> -1
c    ( b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧  p_502) -> ( b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0)
c  in CNF:
c    -b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨  b^{1, 503}_2
c    -b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_1
c    -b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨  b^{1, 503}_0
c  in DIMACS:
-2666 -2667  2668 -502  2669 0
-2666 -2667  2668 -502 -2670 0
-2666 -2667  2668 -502  2671 0

c  -1+1 --> 0
c    ( b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0 ∧  p_502) -> (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧ -b^{1, 503}_0)
c  in CNF:
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_2
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_1
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_0
c  in DIMACS:
-2666  2667 -2668 -502 -2669 0
-2666  2667 -2668 -502 -2670 0
-2666  2667 -2668 -502 -2671 0

c  0+1 --> 1
c    (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧  p_502) -> (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0)
c  in CNF:
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_2
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_1
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨  b^{1, 503}_0
c  in DIMACS:
 2666  2667  2668 -502 -2669 0
 2666  2667  2668 -502 -2670 0
 2666  2667  2668 -502  2671 0

c  1+1 --> 2
c    (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0 ∧  p_502) -> (-b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0)
c  in CNF:
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_2
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨  b^{1, 503}_1
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ -p_502 ∨ -b^{1, 503}_0
c  in DIMACS:
 2666  2667 -2668 -502 -2669 0
 2666  2667 -2668 -502  2670 0
 2666  2667 -2668 -502 -2671 0

c  2+1 --> break 
c    (-b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧  p_502) -> break
c  in CNF:
c     b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ -p_502 ∨ break
c  in DIMACS:
 2666 -2667  2668 -502 1162 0


c  2-1 --> 1
c    (-b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧ -p_502) -> (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0)
c  in CNF:
c     b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_2
c     b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_1
c     b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨  b^{1, 503}_0
c  in DIMACS:
 2666 -2667  2668  502 -2669 0
 2666 -2667  2668  502 -2670 0
 2666 -2667  2668  502  2671 0

c  1-1 --> 0
c    (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0 ∧ -p_502) -> (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧ -b^{1, 503}_0)
c  in CNF:
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_2
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_1
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_0
c  in DIMACS:
 2666  2667 -2668  502 -2669 0
 2666  2667 -2668  502 -2670 0
 2666  2667 -2668  502 -2671 0

c  0-1 --> -1
c    (-b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧ -p_502) -> ( b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0)
c  in CNF:
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨  b^{1, 503}_2
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_1
c     b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨  b^{1, 503}_0
c  in DIMACS:
 2666  2667  2668  502  2669 0
 2666  2667  2668  502 -2670 0
 2666  2667  2668  502  2671 0

c  -1-1 --> -2
c    ( b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧  b^{1, 502}_0 ∧ -p_502) -> ( b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0)
c  in CNF:
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨  b^{1, 503}_2
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨  b^{1, 503}_1
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨  p_502 ∨ -b^{1, 503}_0
c  in DIMACS:
-2666  2667 -2668  502  2669 0
-2666  2667 -2668  502  2670 0
-2666  2667 -2668  502 -2671 0

c  -2-1 --> break 
c    ( b^{1, 502}_2 ∧  b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧ -p_502) -> break
c  in CNF:
c    -b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨  b^{1, 502}_0 ∨  p_502 ∨ break
c  in DIMACS:
-2666 -2667  2668  502 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 502}_2 ∧ -b^{1, 502}_1 ∧ -b^{1, 502}_0 ∧ true) 
c  in CNF:
c    -b^{1, 502}_2 ∨  b^{1, 502}_1 ∨  b^{1, 502}_0 ∨ false 
c  in DIMACS:
-2666  2667  2668  0

c  3 does not represent an automaton state.
c    -(-b^{1, 502}_2 ∧  b^{1, 502}_1 ∧  b^{1, 502}_0 ∧ true) 
c  in CNF:
c     b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ false 
c  in DIMACS:
 2666 -2667 -2668  0
c  -3 does not represent an automaton state.
c    -( b^{1, 502}_2 ∧  b^{1, 502}_1 ∧  b^{1, 502}_0 ∧ true) 
c  in CNF:
c    -b^{1, 502}_2 ∨ -b^{1, 502}_1 ∨ -b^{1, 502}_0 ∨ false 
c  in DIMACS:
-2666 -2667 -2668  0

c i = 503
c  -2+1 --> -1
c    ( b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧  p_503) -> ( b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0)
c  in CNF:
c    -b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨  b^{1, 504}_2
c    -b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_1
c    -b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨  b^{1, 504}_0
c  in DIMACS:
-2669 -2670  2671 -503  2672 0
-2669 -2670  2671 -503 -2673 0
-2669 -2670  2671 -503  2674 0

c  -1+1 --> 0
c    ( b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0 ∧  p_503) -> (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧ -b^{1, 504}_0)
c  in CNF:
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_2
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_1
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_0
c  in DIMACS:
-2669  2670 -2671 -503 -2672 0
-2669  2670 -2671 -503 -2673 0
-2669  2670 -2671 -503 -2674 0

c  0+1 --> 1
c    (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧  p_503) -> (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0)
c  in CNF:
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_2
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_1
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨  b^{1, 504}_0
c  in DIMACS:
 2669  2670  2671 -503 -2672 0
 2669  2670  2671 -503 -2673 0
 2669  2670  2671 -503  2674 0

c  1+1 --> 2
c    (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0 ∧  p_503) -> (-b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0)
c  in CNF:
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_2
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨  b^{1, 504}_1
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ -p_503 ∨ -b^{1, 504}_0
c  in DIMACS:
 2669  2670 -2671 -503 -2672 0
 2669  2670 -2671 -503  2673 0
 2669  2670 -2671 -503 -2674 0

c  2+1 --> break 
c    (-b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧  p_503) -> break
c  in CNF:
c     b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ -p_503 ∨ break
c  in DIMACS:
 2669 -2670  2671 -503 1162 0


c  2-1 --> 1
c    (-b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧ -p_503) -> (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0)
c  in CNF:
c     b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_2
c     b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_1
c     b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨  b^{1, 504}_0
c  in DIMACS:
 2669 -2670  2671  503 -2672 0
 2669 -2670  2671  503 -2673 0
 2669 -2670  2671  503  2674 0

c  1-1 --> 0
c    (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0 ∧ -p_503) -> (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧ -b^{1, 504}_0)
c  in CNF:
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_2
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_1
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_0
c  in DIMACS:
 2669  2670 -2671  503 -2672 0
 2669  2670 -2671  503 -2673 0
 2669  2670 -2671  503 -2674 0

c  0-1 --> -1
c    (-b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧ -p_503) -> ( b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0)
c  in CNF:
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨  b^{1, 504}_2
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_1
c     b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨  b^{1, 504}_0
c  in DIMACS:
 2669  2670  2671  503  2672 0
 2669  2670  2671  503 -2673 0
 2669  2670  2671  503  2674 0

c  -1-1 --> -2
c    ( b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧  b^{1, 503}_0 ∧ -p_503) -> ( b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0)
c  in CNF:
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨  b^{1, 504}_2
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨  b^{1, 504}_1
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨  p_503 ∨ -b^{1, 504}_0
c  in DIMACS:
-2669  2670 -2671  503  2672 0
-2669  2670 -2671  503  2673 0
-2669  2670 -2671  503 -2674 0

c  -2-1 --> break 
c    ( b^{1, 503}_2 ∧  b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧ -p_503) -> break
c  in CNF:
c    -b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨  b^{1, 503}_0 ∨  p_503 ∨ break
c  in DIMACS:
-2669 -2670  2671  503 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 503}_2 ∧ -b^{1, 503}_1 ∧ -b^{1, 503}_0 ∧ true) 
c  in CNF:
c    -b^{1, 503}_2 ∨  b^{1, 503}_1 ∨  b^{1, 503}_0 ∨ false 
c  in DIMACS:
-2669  2670  2671  0

c  3 does not represent an automaton state.
c    -(-b^{1, 503}_2 ∧  b^{1, 503}_1 ∧  b^{1, 503}_0 ∧ true) 
c  in CNF:
c     b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ false 
c  in DIMACS:
 2669 -2670 -2671  0
c  -3 does not represent an automaton state.
c    -( b^{1, 503}_2 ∧  b^{1, 503}_1 ∧  b^{1, 503}_0 ∧ true) 
c  in CNF:
c    -b^{1, 503}_2 ∨ -b^{1, 503}_1 ∨ -b^{1, 503}_0 ∨ false 
c  in DIMACS:
-2669 -2670 -2671  0

c i = 504
c  -2+1 --> -1
c    ( b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧  p_504) -> ( b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0)
c  in CNF:
c    -b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨  b^{1, 505}_2
c    -b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_1
c    -b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨  b^{1, 505}_0
c  in DIMACS:
-2672 -2673  2674 -504  2675 0
-2672 -2673  2674 -504 -2676 0
-2672 -2673  2674 -504  2677 0

c  -1+1 --> 0
c    ( b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0 ∧  p_504) -> (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧ -b^{1, 505}_0)
c  in CNF:
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_2
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_1
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_0
c  in DIMACS:
-2672  2673 -2674 -504 -2675 0
-2672  2673 -2674 -504 -2676 0
-2672  2673 -2674 -504 -2677 0

c  0+1 --> 1
c    (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧  p_504) -> (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0)
c  in CNF:
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_2
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_1
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨  b^{1, 505}_0
c  in DIMACS:
 2672  2673  2674 -504 -2675 0
 2672  2673  2674 -504 -2676 0
 2672  2673  2674 -504  2677 0

c  1+1 --> 2
c    (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0 ∧  p_504) -> (-b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0)
c  in CNF:
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_2
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨  b^{1, 505}_1
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ -p_504 ∨ -b^{1, 505}_0
c  in DIMACS:
 2672  2673 -2674 -504 -2675 0
 2672  2673 -2674 -504  2676 0
 2672  2673 -2674 -504 -2677 0

c  2+1 --> break 
c    (-b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧  p_504) -> break
c  in CNF:
c     b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 2672 -2673  2674 -504 1162 0


c  2-1 --> 1
c    (-b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧ -p_504) -> (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0)
c  in CNF:
c     b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_2
c     b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_1
c     b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨  b^{1, 505}_0
c  in DIMACS:
 2672 -2673  2674  504 -2675 0
 2672 -2673  2674  504 -2676 0
 2672 -2673  2674  504  2677 0

c  1-1 --> 0
c    (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0 ∧ -p_504) -> (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧ -b^{1, 505}_0)
c  in CNF:
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_2
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_1
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_0
c  in DIMACS:
 2672  2673 -2674  504 -2675 0
 2672  2673 -2674  504 -2676 0
 2672  2673 -2674  504 -2677 0

c  0-1 --> -1
c    (-b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧ -p_504) -> ( b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0)
c  in CNF:
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨  b^{1, 505}_2
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_1
c     b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨  b^{1, 505}_0
c  in DIMACS:
 2672  2673  2674  504  2675 0
 2672  2673  2674  504 -2676 0
 2672  2673  2674  504  2677 0

c  -1-1 --> -2
c    ( b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧  b^{1, 504}_0 ∧ -p_504) -> ( b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0)
c  in CNF:
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨  b^{1, 505}_2
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨  b^{1, 505}_1
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨  p_504 ∨ -b^{1, 505}_0
c  in DIMACS:
-2672  2673 -2674  504  2675 0
-2672  2673 -2674  504  2676 0
-2672  2673 -2674  504 -2677 0

c  -2-1 --> break 
c    ( b^{1, 504}_2 ∧  b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨  b^{1, 504}_0 ∨  p_504 ∨ break
c  in DIMACS:
-2672 -2673  2674  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 504}_2 ∧ -b^{1, 504}_1 ∧ -b^{1, 504}_0 ∧ true) 
c  in CNF:
c    -b^{1, 504}_2 ∨  b^{1, 504}_1 ∨  b^{1, 504}_0 ∨ false 
c  in DIMACS:
-2672  2673  2674  0

c  3 does not represent an automaton state.
c    -(-b^{1, 504}_2 ∧  b^{1, 504}_1 ∧  b^{1, 504}_0 ∧ true) 
c  in CNF:
c     b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ false 
c  in DIMACS:
 2672 -2673 -2674  0
c  -3 does not represent an automaton state.
c    -( b^{1, 504}_2 ∧  b^{1, 504}_1 ∧  b^{1, 504}_0 ∧ true) 
c  in CNF:
c    -b^{1, 504}_2 ∨ -b^{1, 504}_1 ∨ -b^{1, 504}_0 ∨ false 
c  in DIMACS:
-2672 -2673 -2674  0

c i = 505
c  -2+1 --> -1
c    ( b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧  p_505) -> ( b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0)
c  in CNF:
c    -b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨  b^{1, 506}_2
c    -b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_1
c    -b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨  b^{1, 506}_0
c  in DIMACS:
-2675 -2676  2677 -505  2678 0
-2675 -2676  2677 -505 -2679 0
-2675 -2676  2677 -505  2680 0

c  -1+1 --> 0
c    ( b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0 ∧  p_505) -> (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧ -b^{1, 506}_0)
c  in CNF:
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_2
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_1
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_0
c  in DIMACS:
-2675  2676 -2677 -505 -2678 0
-2675  2676 -2677 -505 -2679 0
-2675  2676 -2677 -505 -2680 0

c  0+1 --> 1
c    (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧  p_505) -> (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0)
c  in CNF:
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_2
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_1
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨  b^{1, 506}_0
c  in DIMACS:
 2675  2676  2677 -505 -2678 0
 2675  2676  2677 -505 -2679 0
 2675  2676  2677 -505  2680 0

c  1+1 --> 2
c    (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0 ∧  p_505) -> (-b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0)
c  in CNF:
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_2
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨  b^{1, 506}_1
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ -p_505 ∨ -b^{1, 506}_0
c  in DIMACS:
 2675  2676 -2677 -505 -2678 0
 2675  2676 -2677 -505  2679 0
 2675  2676 -2677 -505 -2680 0

c  2+1 --> break 
c    (-b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧  p_505) -> break
c  in CNF:
c     b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ -p_505 ∨ break
c  in DIMACS:
 2675 -2676  2677 -505 1162 0


c  2-1 --> 1
c    (-b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧ -p_505) -> (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0)
c  in CNF:
c     b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_2
c     b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_1
c     b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨  b^{1, 506}_0
c  in DIMACS:
 2675 -2676  2677  505 -2678 0
 2675 -2676  2677  505 -2679 0
 2675 -2676  2677  505  2680 0

c  1-1 --> 0
c    (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0 ∧ -p_505) -> (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧ -b^{1, 506}_0)
c  in CNF:
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_2
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_1
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_0
c  in DIMACS:
 2675  2676 -2677  505 -2678 0
 2675  2676 -2677  505 -2679 0
 2675  2676 -2677  505 -2680 0

c  0-1 --> -1
c    (-b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧ -p_505) -> ( b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0)
c  in CNF:
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨  b^{1, 506}_2
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_1
c     b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨  b^{1, 506}_0
c  in DIMACS:
 2675  2676  2677  505  2678 0
 2675  2676  2677  505 -2679 0
 2675  2676  2677  505  2680 0

c  -1-1 --> -2
c    ( b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧  b^{1, 505}_0 ∧ -p_505) -> ( b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0)
c  in CNF:
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨  b^{1, 506}_2
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨  b^{1, 506}_1
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨  p_505 ∨ -b^{1, 506}_0
c  in DIMACS:
-2675  2676 -2677  505  2678 0
-2675  2676 -2677  505  2679 0
-2675  2676 -2677  505 -2680 0

c  -2-1 --> break 
c    ( b^{1, 505}_2 ∧  b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧ -p_505) -> break
c  in CNF:
c    -b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨  b^{1, 505}_0 ∨  p_505 ∨ break
c  in DIMACS:
-2675 -2676  2677  505 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 505}_2 ∧ -b^{1, 505}_1 ∧ -b^{1, 505}_0 ∧ true) 
c  in CNF:
c    -b^{1, 505}_2 ∨  b^{1, 505}_1 ∨  b^{1, 505}_0 ∨ false 
c  in DIMACS:
-2675  2676  2677  0

c  3 does not represent an automaton state.
c    -(-b^{1, 505}_2 ∧  b^{1, 505}_1 ∧  b^{1, 505}_0 ∧ true) 
c  in CNF:
c     b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ false 
c  in DIMACS:
 2675 -2676 -2677  0
c  -3 does not represent an automaton state.
c    -( b^{1, 505}_2 ∧  b^{1, 505}_1 ∧  b^{1, 505}_0 ∧ true) 
c  in CNF:
c    -b^{1, 505}_2 ∨ -b^{1, 505}_1 ∨ -b^{1, 505}_0 ∨ false 
c  in DIMACS:
-2675 -2676 -2677  0

c i = 506
c  -2+1 --> -1
c    ( b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧  p_506) -> ( b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0)
c  in CNF:
c    -b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨  b^{1, 507}_2
c    -b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_1
c    -b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨  b^{1, 507}_0
c  in DIMACS:
-2678 -2679  2680 -506  2681 0
-2678 -2679  2680 -506 -2682 0
-2678 -2679  2680 -506  2683 0

c  -1+1 --> 0
c    ( b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0 ∧  p_506) -> (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧ -b^{1, 507}_0)
c  in CNF:
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_2
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_1
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_0
c  in DIMACS:
-2678  2679 -2680 -506 -2681 0
-2678  2679 -2680 -506 -2682 0
-2678  2679 -2680 -506 -2683 0

c  0+1 --> 1
c    (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧  p_506) -> (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0)
c  in CNF:
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_2
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_1
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨  b^{1, 507}_0
c  in DIMACS:
 2678  2679  2680 -506 -2681 0
 2678  2679  2680 -506 -2682 0
 2678  2679  2680 -506  2683 0

c  1+1 --> 2
c    (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0 ∧  p_506) -> (-b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0)
c  in CNF:
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_2
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨  b^{1, 507}_1
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ -p_506 ∨ -b^{1, 507}_0
c  in DIMACS:
 2678  2679 -2680 -506 -2681 0
 2678  2679 -2680 -506  2682 0
 2678  2679 -2680 -506 -2683 0

c  2+1 --> break 
c    (-b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧  p_506) -> break
c  in CNF:
c     b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 2678 -2679  2680 -506 1162 0


c  2-1 --> 1
c    (-b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧ -p_506) -> (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0)
c  in CNF:
c     b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_2
c     b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_1
c     b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨  b^{1, 507}_0
c  in DIMACS:
 2678 -2679  2680  506 -2681 0
 2678 -2679  2680  506 -2682 0
 2678 -2679  2680  506  2683 0

c  1-1 --> 0
c    (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0 ∧ -p_506) -> (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧ -b^{1, 507}_0)
c  in CNF:
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_2
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_1
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_0
c  in DIMACS:
 2678  2679 -2680  506 -2681 0
 2678  2679 -2680  506 -2682 0
 2678  2679 -2680  506 -2683 0

c  0-1 --> -1
c    (-b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧ -p_506) -> ( b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0)
c  in CNF:
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨  b^{1, 507}_2
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_1
c     b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨  b^{1, 507}_0
c  in DIMACS:
 2678  2679  2680  506  2681 0
 2678  2679  2680  506 -2682 0
 2678  2679  2680  506  2683 0

c  -1-1 --> -2
c    ( b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧  b^{1, 506}_0 ∧ -p_506) -> ( b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0)
c  in CNF:
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨  b^{1, 507}_2
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨  b^{1, 507}_1
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨  p_506 ∨ -b^{1, 507}_0
c  in DIMACS:
-2678  2679 -2680  506  2681 0
-2678  2679 -2680  506  2682 0
-2678  2679 -2680  506 -2683 0

c  -2-1 --> break 
c    ( b^{1, 506}_2 ∧  b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨  b^{1, 506}_0 ∨  p_506 ∨ break
c  in DIMACS:
-2678 -2679  2680  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 506}_2 ∧ -b^{1, 506}_1 ∧ -b^{1, 506}_0 ∧ true) 
c  in CNF:
c    -b^{1, 506}_2 ∨  b^{1, 506}_1 ∨  b^{1, 506}_0 ∨ false 
c  in DIMACS:
-2678  2679  2680  0

c  3 does not represent an automaton state.
c    -(-b^{1, 506}_2 ∧  b^{1, 506}_1 ∧  b^{1, 506}_0 ∧ true) 
c  in CNF:
c     b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ false 
c  in DIMACS:
 2678 -2679 -2680  0
c  -3 does not represent an automaton state.
c    -( b^{1, 506}_2 ∧  b^{1, 506}_1 ∧  b^{1, 506}_0 ∧ true) 
c  in CNF:
c    -b^{1, 506}_2 ∨ -b^{1, 506}_1 ∨ -b^{1, 506}_0 ∨ false 
c  in DIMACS:
-2678 -2679 -2680  0

c i = 507
c  -2+1 --> -1
c    ( b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧  p_507) -> ( b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0)
c  in CNF:
c    -b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨  b^{1, 508}_2
c    -b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_1
c    -b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨  b^{1, 508}_0
c  in DIMACS:
-2681 -2682  2683 -507  2684 0
-2681 -2682  2683 -507 -2685 0
-2681 -2682  2683 -507  2686 0

c  -1+1 --> 0
c    ( b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0 ∧  p_507) -> (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧ -b^{1, 508}_0)
c  in CNF:
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_2
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_1
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_0
c  in DIMACS:
-2681  2682 -2683 -507 -2684 0
-2681  2682 -2683 -507 -2685 0
-2681  2682 -2683 -507 -2686 0

c  0+1 --> 1
c    (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧  p_507) -> (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0)
c  in CNF:
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_2
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_1
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨  b^{1, 508}_0
c  in DIMACS:
 2681  2682  2683 -507 -2684 0
 2681  2682  2683 -507 -2685 0
 2681  2682  2683 -507  2686 0

c  1+1 --> 2
c    (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0 ∧  p_507) -> (-b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0)
c  in CNF:
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_2
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨  b^{1, 508}_1
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ -p_507 ∨ -b^{1, 508}_0
c  in DIMACS:
 2681  2682 -2683 -507 -2684 0
 2681  2682 -2683 -507  2685 0
 2681  2682 -2683 -507 -2686 0

c  2+1 --> break 
c    (-b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧  p_507) -> break
c  in CNF:
c     b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ -p_507 ∨ break
c  in DIMACS:
 2681 -2682  2683 -507 1162 0


c  2-1 --> 1
c    (-b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧ -p_507) -> (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0)
c  in CNF:
c     b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_2
c     b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_1
c     b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨  b^{1, 508}_0
c  in DIMACS:
 2681 -2682  2683  507 -2684 0
 2681 -2682  2683  507 -2685 0
 2681 -2682  2683  507  2686 0

c  1-1 --> 0
c    (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0 ∧ -p_507) -> (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧ -b^{1, 508}_0)
c  in CNF:
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_2
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_1
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_0
c  in DIMACS:
 2681  2682 -2683  507 -2684 0
 2681  2682 -2683  507 -2685 0
 2681  2682 -2683  507 -2686 0

c  0-1 --> -1
c    (-b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧ -p_507) -> ( b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0)
c  in CNF:
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨  b^{1, 508}_2
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_1
c     b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨  b^{1, 508}_0
c  in DIMACS:
 2681  2682  2683  507  2684 0
 2681  2682  2683  507 -2685 0
 2681  2682  2683  507  2686 0

c  -1-1 --> -2
c    ( b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧  b^{1, 507}_0 ∧ -p_507) -> ( b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0)
c  in CNF:
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨  b^{1, 508}_2
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨  b^{1, 508}_1
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨  p_507 ∨ -b^{1, 508}_0
c  in DIMACS:
-2681  2682 -2683  507  2684 0
-2681  2682 -2683  507  2685 0
-2681  2682 -2683  507 -2686 0

c  -2-1 --> break 
c    ( b^{1, 507}_2 ∧  b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧ -p_507) -> break
c  in CNF:
c    -b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨  b^{1, 507}_0 ∨  p_507 ∨ break
c  in DIMACS:
-2681 -2682  2683  507 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 507}_2 ∧ -b^{1, 507}_1 ∧ -b^{1, 507}_0 ∧ true) 
c  in CNF:
c    -b^{1, 507}_2 ∨  b^{1, 507}_1 ∨  b^{1, 507}_0 ∨ false 
c  in DIMACS:
-2681  2682  2683  0

c  3 does not represent an automaton state.
c    -(-b^{1, 507}_2 ∧  b^{1, 507}_1 ∧  b^{1, 507}_0 ∧ true) 
c  in CNF:
c     b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ false 
c  in DIMACS:
 2681 -2682 -2683  0
c  -3 does not represent an automaton state.
c    -( b^{1, 507}_2 ∧  b^{1, 507}_1 ∧  b^{1, 507}_0 ∧ true) 
c  in CNF:
c    -b^{1, 507}_2 ∨ -b^{1, 507}_1 ∨ -b^{1, 507}_0 ∨ false 
c  in DIMACS:
-2681 -2682 -2683  0

c i = 508
c  -2+1 --> -1
c    ( b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧  p_508) -> ( b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0)
c  in CNF:
c    -b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨  b^{1, 509}_2
c    -b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_1
c    -b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨  b^{1, 509}_0
c  in DIMACS:
-2684 -2685  2686 -508  2687 0
-2684 -2685  2686 -508 -2688 0
-2684 -2685  2686 -508  2689 0

c  -1+1 --> 0
c    ( b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0 ∧  p_508) -> (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧ -b^{1, 509}_0)
c  in CNF:
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_2
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_1
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_0
c  in DIMACS:
-2684  2685 -2686 -508 -2687 0
-2684  2685 -2686 -508 -2688 0
-2684  2685 -2686 -508 -2689 0

c  0+1 --> 1
c    (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧  p_508) -> (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0)
c  in CNF:
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_2
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_1
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨  b^{1, 509}_0
c  in DIMACS:
 2684  2685  2686 -508 -2687 0
 2684  2685  2686 -508 -2688 0
 2684  2685  2686 -508  2689 0

c  1+1 --> 2
c    (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0 ∧  p_508) -> (-b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0)
c  in CNF:
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_2
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨  b^{1, 509}_1
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ -p_508 ∨ -b^{1, 509}_0
c  in DIMACS:
 2684  2685 -2686 -508 -2687 0
 2684  2685 -2686 -508  2688 0
 2684  2685 -2686 -508 -2689 0

c  2+1 --> break 
c    (-b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧  p_508) -> break
c  in CNF:
c     b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ -p_508 ∨ break
c  in DIMACS:
 2684 -2685  2686 -508 1162 0


c  2-1 --> 1
c    (-b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧ -p_508) -> (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0)
c  in CNF:
c     b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_2
c     b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_1
c     b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨  b^{1, 509}_0
c  in DIMACS:
 2684 -2685  2686  508 -2687 0
 2684 -2685  2686  508 -2688 0
 2684 -2685  2686  508  2689 0

c  1-1 --> 0
c    (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0 ∧ -p_508) -> (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧ -b^{1, 509}_0)
c  in CNF:
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_2
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_1
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_0
c  in DIMACS:
 2684  2685 -2686  508 -2687 0
 2684  2685 -2686  508 -2688 0
 2684  2685 -2686  508 -2689 0

c  0-1 --> -1
c    (-b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧ -p_508) -> ( b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0)
c  in CNF:
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨  b^{1, 509}_2
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_1
c     b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨  b^{1, 509}_0
c  in DIMACS:
 2684  2685  2686  508  2687 0
 2684  2685  2686  508 -2688 0
 2684  2685  2686  508  2689 0

c  -1-1 --> -2
c    ( b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧  b^{1, 508}_0 ∧ -p_508) -> ( b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0)
c  in CNF:
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨  b^{1, 509}_2
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨  b^{1, 509}_1
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨  p_508 ∨ -b^{1, 509}_0
c  in DIMACS:
-2684  2685 -2686  508  2687 0
-2684  2685 -2686  508  2688 0
-2684  2685 -2686  508 -2689 0

c  -2-1 --> break 
c    ( b^{1, 508}_2 ∧  b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧ -p_508) -> break
c  in CNF:
c    -b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨  b^{1, 508}_0 ∨  p_508 ∨ break
c  in DIMACS:
-2684 -2685  2686  508 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 508}_2 ∧ -b^{1, 508}_1 ∧ -b^{1, 508}_0 ∧ true) 
c  in CNF:
c    -b^{1, 508}_2 ∨  b^{1, 508}_1 ∨  b^{1, 508}_0 ∨ false 
c  in DIMACS:
-2684  2685  2686  0

c  3 does not represent an automaton state.
c    -(-b^{1, 508}_2 ∧  b^{1, 508}_1 ∧  b^{1, 508}_0 ∧ true) 
c  in CNF:
c     b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ false 
c  in DIMACS:
 2684 -2685 -2686  0
c  -3 does not represent an automaton state.
c    -( b^{1, 508}_2 ∧  b^{1, 508}_1 ∧  b^{1, 508}_0 ∧ true) 
c  in CNF:
c    -b^{1, 508}_2 ∨ -b^{1, 508}_1 ∨ -b^{1, 508}_0 ∨ false 
c  in DIMACS:
-2684 -2685 -2686  0

c i = 509
c  -2+1 --> -1
c    ( b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧  p_509) -> ( b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0)
c  in CNF:
c    -b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨  b^{1, 510}_2
c    -b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_1
c    -b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨  b^{1, 510}_0
c  in DIMACS:
-2687 -2688  2689 -509  2690 0
-2687 -2688  2689 -509 -2691 0
-2687 -2688  2689 -509  2692 0

c  -1+1 --> 0
c    ( b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0 ∧  p_509) -> (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧ -b^{1, 510}_0)
c  in CNF:
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_2
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_1
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_0
c  in DIMACS:
-2687  2688 -2689 -509 -2690 0
-2687  2688 -2689 -509 -2691 0
-2687  2688 -2689 -509 -2692 0

c  0+1 --> 1
c    (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧  p_509) -> (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0)
c  in CNF:
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_2
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_1
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨  b^{1, 510}_0
c  in DIMACS:
 2687  2688  2689 -509 -2690 0
 2687  2688  2689 -509 -2691 0
 2687  2688  2689 -509  2692 0

c  1+1 --> 2
c    (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0 ∧  p_509) -> (-b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0)
c  in CNF:
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_2
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨  b^{1, 510}_1
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ -p_509 ∨ -b^{1, 510}_0
c  in DIMACS:
 2687  2688 -2689 -509 -2690 0
 2687  2688 -2689 -509  2691 0
 2687  2688 -2689 -509 -2692 0

c  2+1 --> break 
c    (-b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧  p_509) -> break
c  in CNF:
c     b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ -p_509 ∨ break
c  in DIMACS:
 2687 -2688  2689 -509 1162 0


c  2-1 --> 1
c    (-b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧ -p_509) -> (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0)
c  in CNF:
c     b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_2
c     b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_1
c     b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨  b^{1, 510}_0
c  in DIMACS:
 2687 -2688  2689  509 -2690 0
 2687 -2688  2689  509 -2691 0
 2687 -2688  2689  509  2692 0

c  1-1 --> 0
c    (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0 ∧ -p_509) -> (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧ -b^{1, 510}_0)
c  in CNF:
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_2
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_1
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_0
c  in DIMACS:
 2687  2688 -2689  509 -2690 0
 2687  2688 -2689  509 -2691 0
 2687  2688 -2689  509 -2692 0

c  0-1 --> -1
c    (-b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧ -p_509) -> ( b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0)
c  in CNF:
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨  b^{1, 510}_2
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_1
c     b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨  b^{1, 510}_0
c  in DIMACS:
 2687  2688  2689  509  2690 0
 2687  2688  2689  509 -2691 0
 2687  2688  2689  509  2692 0

c  -1-1 --> -2
c    ( b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧  b^{1, 509}_0 ∧ -p_509) -> ( b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0)
c  in CNF:
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨  b^{1, 510}_2
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨  b^{1, 510}_1
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨  p_509 ∨ -b^{1, 510}_0
c  in DIMACS:
-2687  2688 -2689  509  2690 0
-2687  2688 -2689  509  2691 0
-2687  2688 -2689  509 -2692 0

c  -2-1 --> break 
c    ( b^{1, 509}_2 ∧  b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧ -p_509) -> break
c  in CNF:
c    -b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨  b^{1, 509}_0 ∨  p_509 ∨ break
c  in DIMACS:
-2687 -2688  2689  509 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 509}_2 ∧ -b^{1, 509}_1 ∧ -b^{1, 509}_0 ∧ true) 
c  in CNF:
c    -b^{1, 509}_2 ∨  b^{1, 509}_1 ∨  b^{1, 509}_0 ∨ false 
c  in DIMACS:
-2687  2688  2689  0

c  3 does not represent an automaton state.
c    -(-b^{1, 509}_2 ∧  b^{1, 509}_1 ∧  b^{1, 509}_0 ∧ true) 
c  in CNF:
c     b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ false 
c  in DIMACS:
 2687 -2688 -2689  0
c  -3 does not represent an automaton state.
c    -( b^{1, 509}_2 ∧  b^{1, 509}_1 ∧  b^{1, 509}_0 ∧ true) 
c  in CNF:
c    -b^{1, 509}_2 ∨ -b^{1, 509}_1 ∨ -b^{1, 509}_0 ∨ false 
c  in DIMACS:
-2687 -2688 -2689  0

c i = 510
c  -2+1 --> -1
c    ( b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧  p_510) -> ( b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0)
c  in CNF:
c    -b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨  b^{1, 511}_2
c    -b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_1
c    -b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨  b^{1, 511}_0
c  in DIMACS:
-2690 -2691  2692 -510  2693 0
-2690 -2691  2692 -510 -2694 0
-2690 -2691  2692 -510  2695 0

c  -1+1 --> 0
c    ( b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0 ∧  p_510) -> (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧ -b^{1, 511}_0)
c  in CNF:
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_2
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_1
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_0
c  in DIMACS:
-2690  2691 -2692 -510 -2693 0
-2690  2691 -2692 -510 -2694 0
-2690  2691 -2692 -510 -2695 0

c  0+1 --> 1
c    (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧  p_510) -> (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0)
c  in CNF:
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_2
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_1
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨  b^{1, 511}_0
c  in DIMACS:
 2690  2691  2692 -510 -2693 0
 2690  2691  2692 -510 -2694 0
 2690  2691  2692 -510  2695 0

c  1+1 --> 2
c    (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0 ∧  p_510) -> (-b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0)
c  in CNF:
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_2
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨  b^{1, 511}_1
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ -p_510 ∨ -b^{1, 511}_0
c  in DIMACS:
 2690  2691 -2692 -510 -2693 0
 2690  2691 -2692 -510  2694 0
 2690  2691 -2692 -510 -2695 0

c  2+1 --> break 
c    (-b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧  p_510) -> break
c  in CNF:
c     b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 2690 -2691  2692 -510 1162 0


c  2-1 --> 1
c    (-b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧ -p_510) -> (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0)
c  in CNF:
c     b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_2
c     b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_1
c     b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨  b^{1, 511}_0
c  in DIMACS:
 2690 -2691  2692  510 -2693 0
 2690 -2691  2692  510 -2694 0
 2690 -2691  2692  510  2695 0

c  1-1 --> 0
c    (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0 ∧ -p_510) -> (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧ -b^{1, 511}_0)
c  in CNF:
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_2
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_1
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_0
c  in DIMACS:
 2690  2691 -2692  510 -2693 0
 2690  2691 -2692  510 -2694 0
 2690  2691 -2692  510 -2695 0

c  0-1 --> -1
c    (-b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧ -p_510) -> ( b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0)
c  in CNF:
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨  b^{1, 511}_2
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_1
c     b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨  b^{1, 511}_0
c  in DIMACS:
 2690  2691  2692  510  2693 0
 2690  2691  2692  510 -2694 0
 2690  2691  2692  510  2695 0

c  -1-1 --> -2
c    ( b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧  b^{1, 510}_0 ∧ -p_510) -> ( b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0)
c  in CNF:
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨  b^{1, 511}_2
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨  b^{1, 511}_1
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨  p_510 ∨ -b^{1, 511}_0
c  in DIMACS:
-2690  2691 -2692  510  2693 0
-2690  2691 -2692  510  2694 0
-2690  2691 -2692  510 -2695 0

c  -2-1 --> break 
c    ( b^{1, 510}_2 ∧  b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨  b^{1, 510}_0 ∨  p_510 ∨ break
c  in DIMACS:
-2690 -2691  2692  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 510}_2 ∧ -b^{1, 510}_1 ∧ -b^{1, 510}_0 ∧ true) 
c  in CNF:
c    -b^{1, 510}_2 ∨  b^{1, 510}_1 ∨  b^{1, 510}_0 ∨ false 
c  in DIMACS:
-2690  2691  2692  0

c  3 does not represent an automaton state.
c    -(-b^{1, 510}_2 ∧  b^{1, 510}_1 ∧  b^{1, 510}_0 ∧ true) 
c  in CNF:
c     b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ false 
c  in DIMACS:
 2690 -2691 -2692  0
c  -3 does not represent an automaton state.
c    -( b^{1, 510}_2 ∧  b^{1, 510}_1 ∧  b^{1, 510}_0 ∧ true) 
c  in CNF:
c    -b^{1, 510}_2 ∨ -b^{1, 510}_1 ∨ -b^{1, 510}_0 ∨ false 
c  in DIMACS:
-2690 -2691 -2692  0

c i = 511
c  -2+1 --> -1
c    ( b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧  p_511) -> ( b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0)
c  in CNF:
c    -b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨  b^{1, 512}_2
c    -b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_1
c    -b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨  b^{1, 512}_0
c  in DIMACS:
-2693 -2694  2695 -511  2696 0
-2693 -2694  2695 -511 -2697 0
-2693 -2694  2695 -511  2698 0

c  -1+1 --> 0
c    ( b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0 ∧  p_511) -> (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧ -b^{1, 512}_0)
c  in CNF:
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_2
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_1
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_0
c  in DIMACS:
-2693  2694 -2695 -511 -2696 0
-2693  2694 -2695 -511 -2697 0
-2693  2694 -2695 -511 -2698 0

c  0+1 --> 1
c    (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧  p_511) -> (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0)
c  in CNF:
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_2
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_1
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨  b^{1, 512}_0
c  in DIMACS:
 2693  2694  2695 -511 -2696 0
 2693  2694  2695 -511 -2697 0
 2693  2694  2695 -511  2698 0

c  1+1 --> 2
c    (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0 ∧  p_511) -> (-b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0)
c  in CNF:
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_2
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨  b^{1, 512}_1
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ -p_511 ∨ -b^{1, 512}_0
c  in DIMACS:
 2693  2694 -2695 -511 -2696 0
 2693  2694 -2695 -511  2697 0
 2693  2694 -2695 -511 -2698 0

c  2+1 --> break 
c    (-b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧  p_511) -> break
c  in CNF:
c     b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ -p_511 ∨ break
c  in DIMACS:
 2693 -2694  2695 -511 1162 0


c  2-1 --> 1
c    (-b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧ -p_511) -> (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0)
c  in CNF:
c     b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_2
c     b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_1
c     b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨  b^{1, 512}_0
c  in DIMACS:
 2693 -2694  2695  511 -2696 0
 2693 -2694  2695  511 -2697 0
 2693 -2694  2695  511  2698 0

c  1-1 --> 0
c    (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0 ∧ -p_511) -> (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧ -b^{1, 512}_0)
c  in CNF:
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_2
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_1
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_0
c  in DIMACS:
 2693  2694 -2695  511 -2696 0
 2693  2694 -2695  511 -2697 0
 2693  2694 -2695  511 -2698 0

c  0-1 --> -1
c    (-b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧ -p_511) -> ( b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0)
c  in CNF:
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨  b^{1, 512}_2
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_1
c     b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨  b^{1, 512}_0
c  in DIMACS:
 2693  2694  2695  511  2696 0
 2693  2694  2695  511 -2697 0
 2693  2694  2695  511  2698 0

c  -1-1 --> -2
c    ( b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧  b^{1, 511}_0 ∧ -p_511) -> ( b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0)
c  in CNF:
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨  b^{1, 512}_2
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨  b^{1, 512}_1
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨  p_511 ∨ -b^{1, 512}_0
c  in DIMACS:
-2693  2694 -2695  511  2696 0
-2693  2694 -2695  511  2697 0
-2693  2694 -2695  511 -2698 0

c  -2-1 --> break 
c    ( b^{1, 511}_2 ∧  b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧ -p_511) -> break
c  in CNF:
c    -b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨  b^{1, 511}_0 ∨  p_511 ∨ break
c  in DIMACS:
-2693 -2694  2695  511 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 511}_2 ∧ -b^{1, 511}_1 ∧ -b^{1, 511}_0 ∧ true) 
c  in CNF:
c    -b^{1, 511}_2 ∨  b^{1, 511}_1 ∨  b^{1, 511}_0 ∨ false 
c  in DIMACS:
-2693  2694  2695  0

c  3 does not represent an automaton state.
c    -(-b^{1, 511}_2 ∧  b^{1, 511}_1 ∧  b^{1, 511}_0 ∧ true) 
c  in CNF:
c     b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ false 
c  in DIMACS:
 2693 -2694 -2695  0
c  -3 does not represent an automaton state.
c    -( b^{1, 511}_2 ∧  b^{1, 511}_1 ∧  b^{1, 511}_0 ∧ true) 
c  in CNF:
c    -b^{1, 511}_2 ∨ -b^{1, 511}_1 ∨ -b^{1, 511}_0 ∨ false 
c  in DIMACS:
-2693 -2694 -2695  0

c i = 512
c  -2+1 --> -1
c    ( b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧  p_512) -> ( b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0)
c  in CNF:
c    -b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨  b^{1, 513}_2
c    -b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_1
c    -b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨  b^{1, 513}_0
c  in DIMACS:
-2696 -2697  2698 -512  2699 0
-2696 -2697  2698 -512 -2700 0
-2696 -2697  2698 -512  2701 0

c  -1+1 --> 0
c    ( b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0 ∧  p_512) -> (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧ -b^{1, 513}_0)
c  in CNF:
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_2
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_1
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_0
c  in DIMACS:
-2696  2697 -2698 -512 -2699 0
-2696  2697 -2698 -512 -2700 0
-2696  2697 -2698 -512 -2701 0

c  0+1 --> 1
c    (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧  p_512) -> (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0)
c  in CNF:
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_2
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_1
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨  b^{1, 513}_0
c  in DIMACS:
 2696  2697  2698 -512 -2699 0
 2696  2697  2698 -512 -2700 0
 2696  2697  2698 -512  2701 0

c  1+1 --> 2
c    (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0 ∧  p_512) -> (-b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0)
c  in CNF:
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_2
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨  b^{1, 513}_1
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ -p_512 ∨ -b^{1, 513}_0
c  in DIMACS:
 2696  2697 -2698 -512 -2699 0
 2696  2697 -2698 -512  2700 0
 2696  2697 -2698 -512 -2701 0

c  2+1 --> break 
c    (-b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧  p_512) -> break
c  in CNF:
c     b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 2696 -2697  2698 -512 1162 0


c  2-1 --> 1
c    (-b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧ -p_512) -> (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0)
c  in CNF:
c     b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_2
c     b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_1
c     b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨  b^{1, 513}_0
c  in DIMACS:
 2696 -2697  2698  512 -2699 0
 2696 -2697  2698  512 -2700 0
 2696 -2697  2698  512  2701 0

c  1-1 --> 0
c    (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0 ∧ -p_512) -> (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧ -b^{1, 513}_0)
c  in CNF:
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_2
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_1
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_0
c  in DIMACS:
 2696  2697 -2698  512 -2699 0
 2696  2697 -2698  512 -2700 0
 2696  2697 -2698  512 -2701 0

c  0-1 --> -1
c    (-b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧ -p_512) -> ( b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0)
c  in CNF:
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨  b^{1, 513}_2
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_1
c     b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨  b^{1, 513}_0
c  in DIMACS:
 2696  2697  2698  512  2699 0
 2696  2697  2698  512 -2700 0
 2696  2697  2698  512  2701 0

c  -1-1 --> -2
c    ( b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧  b^{1, 512}_0 ∧ -p_512) -> ( b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0)
c  in CNF:
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨  b^{1, 513}_2
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨  b^{1, 513}_1
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨  p_512 ∨ -b^{1, 513}_0
c  in DIMACS:
-2696  2697 -2698  512  2699 0
-2696  2697 -2698  512  2700 0
-2696  2697 -2698  512 -2701 0

c  -2-1 --> break 
c    ( b^{1, 512}_2 ∧  b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨  b^{1, 512}_0 ∨  p_512 ∨ break
c  in DIMACS:
-2696 -2697  2698  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 512}_2 ∧ -b^{1, 512}_1 ∧ -b^{1, 512}_0 ∧ true) 
c  in CNF:
c    -b^{1, 512}_2 ∨  b^{1, 512}_1 ∨  b^{1, 512}_0 ∨ false 
c  in DIMACS:
-2696  2697  2698  0

c  3 does not represent an automaton state.
c    -(-b^{1, 512}_2 ∧  b^{1, 512}_1 ∧  b^{1, 512}_0 ∧ true) 
c  in CNF:
c     b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ false 
c  in DIMACS:
 2696 -2697 -2698  0
c  -3 does not represent an automaton state.
c    -( b^{1, 512}_2 ∧  b^{1, 512}_1 ∧  b^{1, 512}_0 ∧ true) 
c  in CNF:
c    -b^{1, 512}_2 ∨ -b^{1, 512}_1 ∨ -b^{1, 512}_0 ∨ false 
c  in DIMACS:
-2696 -2697 -2698  0

c i = 513
c  -2+1 --> -1
c    ( b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧  p_513) -> ( b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0)
c  in CNF:
c    -b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨  b^{1, 514}_2
c    -b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_1
c    -b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨  b^{1, 514}_0
c  in DIMACS:
-2699 -2700  2701 -513  2702 0
-2699 -2700  2701 -513 -2703 0
-2699 -2700  2701 -513  2704 0

c  -1+1 --> 0
c    ( b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0 ∧  p_513) -> (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧ -b^{1, 514}_0)
c  in CNF:
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_2
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_1
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_0
c  in DIMACS:
-2699  2700 -2701 -513 -2702 0
-2699  2700 -2701 -513 -2703 0
-2699  2700 -2701 -513 -2704 0

c  0+1 --> 1
c    (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧  p_513) -> (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0)
c  in CNF:
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_2
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_1
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨  b^{1, 514}_0
c  in DIMACS:
 2699  2700  2701 -513 -2702 0
 2699  2700  2701 -513 -2703 0
 2699  2700  2701 -513  2704 0

c  1+1 --> 2
c    (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0 ∧  p_513) -> (-b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0)
c  in CNF:
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_2
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨  b^{1, 514}_1
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ -p_513 ∨ -b^{1, 514}_0
c  in DIMACS:
 2699  2700 -2701 -513 -2702 0
 2699  2700 -2701 -513  2703 0
 2699  2700 -2701 -513 -2704 0

c  2+1 --> break 
c    (-b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧  p_513) -> break
c  in CNF:
c     b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 2699 -2700  2701 -513 1162 0


c  2-1 --> 1
c    (-b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧ -p_513) -> (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0)
c  in CNF:
c     b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_2
c     b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_1
c     b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨  b^{1, 514}_0
c  in DIMACS:
 2699 -2700  2701  513 -2702 0
 2699 -2700  2701  513 -2703 0
 2699 -2700  2701  513  2704 0

c  1-1 --> 0
c    (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0 ∧ -p_513) -> (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧ -b^{1, 514}_0)
c  in CNF:
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_2
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_1
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_0
c  in DIMACS:
 2699  2700 -2701  513 -2702 0
 2699  2700 -2701  513 -2703 0
 2699  2700 -2701  513 -2704 0

c  0-1 --> -1
c    (-b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧ -p_513) -> ( b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0)
c  in CNF:
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨  b^{1, 514}_2
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_1
c     b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨  b^{1, 514}_0
c  in DIMACS:
 2699  2700  2701  513  2702 0
 2699  2700  2701  513 -2703 0
 2699  2700  2701  513  2704 0

c  -1-1 --> -2
c    ( b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧  b^{1, 513}_0 ∧ -p_513) -> ( b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0)
c  in CNF:
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨  b^{1, 514}_2
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨  b^{1, 514}_1
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨  p_513 ∨ -b^{1, 514}_0
c  in DIMACS:
-2699  2700 -2701  513  2702 0
-2699  2700 -2701  513  2703 0
-2699  2700 -2701  513 -2704 0

c  -2-1 --> break 
c    ( b^{1, 513}_2 ∧  b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨  b^{1, 513}_0 ∨  p_513 ∨ break
c  in DIMACS:
-2699 -2700  2701  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 513}_2 ∧ -b^{1, 513}_1 ∧ -b^{1, 513}_0 ∧ true) 
c  in CNF:
c    -b^{1, 513}_2 ∨  b^{1, 513}_1 ∨  b^{1, 513}_0 ∨ false 
c  in DIMACS:
-2699  2700  2701  0

c  3 does not represent an automaton state.
c    -(-b^{1, 513}_2 ∧  b^{1, 513}_1 ∧  b^{1, 513}_0 ∧ true) 
c  in CNF:
c     b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ false 
c  in DIMACS:
 2699 -2700 -2701  0
c  -3 does not represent an automaton state.
c    -( b^{1, 513}_2 ∧  b^{1, 513}_1 ∧  b^{1, 513}_0 ∧ true) 
c  in CNF:
c    -b^{1, 513}_2 ∨ -b^{1, 513}_1 ∨ -b^{1, 513}_0 ∨ false 
c  in DIMACS:
-2699 -2700 -2701  0

c i = 514
c  -2+1 --> -1
c    ( b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧  p_514) -> ( b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0)
c  in CNF:
c    -b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨  b^{1, 515}_2
c    -b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_1
c    -b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨  b^{1, 515}_0
c  in DIMACS:
-2702 -2703  2704 -514  2705 0
-2702 -2703  2704 -514 -2706 0
-2702 -2703  2704 -514  2707 0

c  -1+1 --> 0
c    ( b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0 ∧  p_514) -> (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧ -b^{1, 515}_0)
c  in CNF:
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_2
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_1
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_0
c  in DIMACS:
-2702  2703 -2704 -514 -2705 0
-2702  2703 -2704 -514 -2706 0
-2702  2703 -2704 -514 -2707 0

c  0+1 --> 1
c    (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧  p_514) -> (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0)
c  in CNF:
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_2
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_1
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨  b^{1, 515}_0
c  in DIMACS:
 2702  2703  2704 -514 -2705 0
 2702  2703  2704 -514 -2706 0
 2702  2703  2704 -514  2707 0

c  1+1 --> 2
c    (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0 ∧  p_514) -> (-b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0)
c  in CNF:
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_2
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨  b^{1, 515}_1
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ -p_514 ∨ -b^{1, 515}_0
c  in DIMACS:
 2702  2703 -2704 -514 -2705 0
 2702  2703 -2704 -514  2706 0
 2702  2703 -2704 -514 -2707 0

c  2+1 --> break 
c    (-b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧  p_514) -> break
c  in CNF:
c     b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ -p_514 ∨ break
c  in DIMACS:
 2702 -2703  2704 -514 1162 0


c  2-1 --> 1
c    (-b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧ -p_514) -> (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0)
c  in CNF:
c     b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_2
c     b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_1
c     b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨  b^{1, 515}_0
c  in DIMACS:
 2702 -2703  2704  514 -2705 0
 2702 -2703  2704  514 -2706 0
 2702 -2703  2704  514  2707 0

c  1-1 --> 0
c    (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0 ∧ -p_514) -> (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧ -b^{1, 515}_0)
c  in CNF:
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_2
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_1
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_0
c  in DIMACS:
 2702  2703 -2704  514 -2705 0
 2702  2703 -2704  514 -2706 0
 2702  2703 -2704  514 -2707 0

c  0-1 --> -1
c    (-b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧ -p_514) -> ( b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0)
c  in CNF:
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨  b^{1, 515}_2
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_1
c     b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨  b^{1, 515}_0
c  in DIMACS:
 2702  2703  2704  514  2705 0
 2702  2703  2704  514 -2706 0
 2702  2703  2704  514  2707 0

c  -1-1 --> -2
c    ( b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧  b^{1, 514}_0 ∧ -p_514) -> ( b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0)
c  in CNF:
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨  b^{1, 515}_2
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨  b^{1, 515}_1
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨  p_514 ∨ -b^{1, 515}_0
c  in DIMACS:
-2702  2703 -2704  514  2705 0
-2702  2703 -2704  514  2706 0
-2702  2703 -2704  514 -2707 0

c  -2-1 --> break 
c    ( b^{1, 514}_2 ∧  b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧ -p_514) -> break
c  in CNF:
c    -b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨  b^{1, 514}_0 ∨  p_514 ∨ break
c  in DIMACS:
-2702 -2703  2704  514 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 514}_2 ∧ -b^{1, 514}_1 ∧ -b^{1, 514}_0 ∧ true) 
c  in CNF:
c    -b^{1, 514}_2 ∨  b^{1, 514}_1 ∨  b^{1, 514}_0 ∨ false 
c  in DIMACS:
-2702  2703  2704  0

c  3 does not represent an automaton state.
c    -(-b^{1, 514}_2 ∧  b^{1, 514}_1 ∧  b^{1, 514}_0 ∧ true) 
c  in CNF:
c     b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ false 
c  in DIMACS:
 2702 -2703 -2704  0
c  -3 does not represent an automaton state.
c    -( b^{1, 514}_2 ∧  b^{1, 514}_1 ∧  b^{1, 514}_0 ∧ true) 
c  in CNF:
c    -b^{1, 514}_2 ∨ -b^{1, 514}_1 ∨ -b^{1, 514}_0 ∨ false 
c  in DIMACS:
-2702 -2703 -2704  0

c i = 515
c  -2+1 --> -1
c    ( b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧  p_515) -> ( b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0)
c  in CNF:
c    -b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨  b^{1, 516}_2
c    -b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_1
c    -b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨  b^{1, 516}_0
c  in DIMACS:
-2705 -2706  2707 -515  2708 0
-2705 -2706  2707 -515 -2709 0
-2705 -2706  2707 -515  2710 0

c  -1+1 --> 0
c    ( b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0 ∧  p_515) -> (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧ -b^{1, 516}_0)
c  in CNF:
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_2
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_1
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_0
c  in DIMACS:
-2705  2706 -2707 -515 -2708 0
-2705  2706 -2707 -515 -2709 0
-2705  2706 -2707 -515 -2710 0

c  0+1 --> 1
c    (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧  p_515) -> (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0)
c  in CNF:
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_2
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_1
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨  b^{1, 516}_0
c  in DIMACS:
 2705  2706  2707 -515 -2708 0
 2705  2706  2707 -515 -2709 0
 2705  2706  2707 -515  2710 0

c  1+1 --> 2
c    (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0 ∧  p_515) -> (-b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0)
c  in CNF:
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_2
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨  b^{1, 516}_1
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ -p_515 ∨ -b^{1, 516}_0
c  in DIMACS:
 2705  2706 -2707 -515 -2708 0
 2705  2706 -2707 -515  2709 0
 2705  2706 -2707 -515 -2710 0

c  2+1 --> break 
c    (-b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧  p_515) -> break
c  in CNF:
c     b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ -p_515 ∨ break
c  in DIMACS:
 2705 -2706  2707 -515 1162 0


c  2-1 --> 1
c    (-b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧ -p_515) -> (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0)
c  in CNF:
c     b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_2
c     b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_1
c     b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨  b^{1, 516}_0
c  in DIMACS:
 2705 -2706  2707  515 -2708 0
 2705 -2706  2707  515 -2709 0
 2705 -2706  2707  515  2710 0

c  1-1 --> 0
c    (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0 ∧ -p_515) -> (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧ -b^{1, 516}_0)
c  in CNF:
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_2
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_1
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_0
c  in DIMACS:
 2705  2706 -2707  515 -2708 0
 2705  2706 -2707  515 -2709 0
 2705  2706 -2707  515 -2710 0

c  0-1 --> -1
c    (-b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧ -p_515) -> ( b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0)
c  in CNF:
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨  b^{1, 516}_2
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_1
c     b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨  b^{1, 516}_0
c  in DIMACS:
 2705  2706  2707  515  2708 0
 2705  2706  2707  515 -2709 0
 2705  2706  2707  515  2710 0

c  -1-1 --> -2
c    ( b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧  b^{1, 515}_0 ∧ -p_515) -> ( b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0)
c  in CNF:
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨  b^{1, 516}_2
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨  b^{1, 516}_1
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨  p_515 ∨ -b^{1, 516}_0
c  in DIMACS:
-2705  2706 -2707  515  2708 0
-2705  2706 -2707  515  2709 0
-2705  2706 -2707  515 -2710 0

c  -2-1 --> break 
c    ( b^{1, 515}_2 ∧  b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧ -p_515) -> break
c  in CNF:
c    -b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨  b^{1, 515}_0 ∨  p_515 ∨ break
c  in DIMACS:
-2705 -2706  2707  515 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 515}_2 ∧ -b^{1, 515}_1 ∧ -b^{1, 515}_0 ∧ true) 
c  in CNF:
c    -b^{1, 515}_2 ∨  b^{1, 515}_1 ∨  b^{1, 515}_0 ∨ false 
c  in DIMACS:
-2705  2706  2707  0

c  3 does not represent an automaton state.
c    -(-b^{1, 515}_2 ∧  b^{1, 515}_1 ∧  b^{1, 515}_0 ∧ true) 
c  in CNF:
c     b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ false 
c  in DIMACS:
 2705 -2706 -2707  0
c  -3 does not represent an automaton state.
c    -( b^{1, 515}_2 ∧  b^{1, 515}_1 ∧  b^{1, 515}_0 ∧ true) 
c  in CNF:
c    -b^{1, 515}_2 ∨ -b^{1, 515}_1 ∨ -b^{1, 515}_0 ∨ false 
c  in DIMACS:
-2705 -2706 -2707  0

c i = 516
c  -2+1 --> -1
c    ( b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧  p_516) -> ( b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0)
c  in CNF:
c    -b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨  b^{1, 517}_2
c    -b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_1
c    -b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨  b^{1, 517}_0
c  in DIMACS:
-2708 -2709  2710 -516  2711 0
-2708 -2709  2710 -516 -2712 0
-2708 -2709  2710 -516  2713 0

c  -1+1 --> 0
c    ( b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0 ∧  p_516) -> (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧ -b^{1, 517}_0)
c  in CNF:
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_2
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_1
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_0
c  in DIMACS:
-2708  2709 -2710 -516 -2711 0
-2708  2709 -2710 -516 -2712 0
-2708  2709 -2710 -516 -2713 0

c  0+1 --> 1
c    (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧  p_516) -> (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0)
c  in CNF:
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_2
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_1
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨  b^{1, 517}_0
c  in DIMACS:
 2708  2709  2710 -516 -2711 0
 2708  2709  2710 -516 -2712 0
 2708  2709  2710 -516  2713 0

c  1+1 --> 2
c    (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0 ∧  p_516) -> (-b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0)
c  in CNF:
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_2
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨  b^{1, 517}_1
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ -p_516 ∨ -b^{1, 517}_0
c  in DIMACS:
 2708  2709 -2710 -516 -2711 0
 2708  2709 -2710 -516  2712 0
 2708  2709 -2710 -516 -2713 0

c  2+1 --> break 
c    (-b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧  p_516) -> break
c  in CNF:
c     b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 2708 -2709  2710 -516 1162 0


c  2-1 --> 1
c    (-b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧ -p_516) -> (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0)
c  in CNF:
c     b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_2
c     b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_1
c     b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨  b^{1, 517}_0
c  in DIMACS:
 2708 -2709  2710  516 -2711 0
 2708 -2709  2710  516 -2712 0
 2708 -2709  2710  516  2713 0

c  1-1 --> 0
c    (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0 ∧ -p_516) -> (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧ -b^{1, 517}_0)
c  in CNF:
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_2
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_1
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_0
c  in DIMACS:
 2708  2709 -2710  516 -2711 0
 2708  2709 -2710  516 -2712 0
 2708  2709 -2710  516 -2713 0

c  0-1 --> -1
c    (-b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧ -p_516) -> ( b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0)
c  in CNF:
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨  b^{1, 517}_2
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_1
c     b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨  b^{1, 517}_0
c  in DIMACS:
 2708  2709  2710  516  2711 0
 2708  2709  2710  516 -2712 0
 2708  2709  2710  516  2713 0

c  -1-1 --> -2
c    ( b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧  b^{1, 516}_0 ∧ -p_516) -> ( b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0)
c  in CNF:
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨  b^{1, 517}_2
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨  b^{1, 517}_1
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨  p_516 ∨ -b^{1, 517}_0
c  in DIMACS:
-2708  2709 -2710  516  2711 0
-2708  2709 -2710  516  2712 0
-2708  2709 -2710  516 -2713 0

c  -2-1 --> break 
c    ( b^{1, 516}_2 ∧  b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨  b^{1, 516}_0 ∨  p_516 ∨ break
c  in DIMACS:
-2708 -2709  2710  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 516}_2 ∧ -b^{1, 516}_1 ∧ -b^{1, 516}_0 ∧ true) 
c  in CNF:
c    -b^{1, 516}_2 ∨  b^{1, 516}_1 ∨  b^{1, 516}_0 ∨ false 
c  in DIMACS:
-2708  2709  2710  0

c  3 does not represent an automaton state.
c    -(-b^{1, 516}_2 ∧  b^{1, 516}_1 ∧  b^{1, 516}_0 ∧ true) 
c  in CNF:
c     b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ false 
c  in DIMACS:
 2708 -2709 -2710  0
c  -3 does not represent an automaton state.
c    -( b^{1, 516}_2 ∧  b^{1, 516}_1 ∧  b^{1, 516}_0 ∧ true) 
c  in CNF:
c    -b^{1, 516}_2 ∨ -b^{1, 516}_1 ∨ -b^{1, 516}_0 ∨ false 
c  in DIMACS:
-2708 -2709 -2710  0

c i = 517
c  -2+1 --> -1
c    ( b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧  p_517) -> ( b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0)
c  in CNF:
c    -b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨  b^{1, 518}_2
c    -b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_1
c    -b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨  b^{1, 518}_0
c  in DIMACS:
-2711 -2712  2713 -517  2714 0
-2711 -2712  2713 -517 -2715 0
-2711 -2712  2713 -517  2716 0

c  -1+1 --> 0
c    ( b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0 ∧  p_517) -> (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧ -b^{1, 518}_0)
c  in CNF:
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_2
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_1
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_0
c  in DIMACS:
-2711  2712 -2713 -517 -2714 0
-2711  2712 -2713 -517 -2715 0
-2711  2712 -2713 -517 -2716 0

c  0+1 --> 1
c    (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧  p_517) -> (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0)
c  in CNF:
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_2
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_1
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨  b^{1, 518}_0
c  in DIMACS:
 2711  2712  2713 -517 -2714 0
 2711  2712  2713 -517 -2715 0
 2711  2712  2713 -517  2716 0

c  1+1 --> 2
c    (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0 ∧  p_517) -> (-b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0)
c  in CNF:
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_2
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨  b^{1, 518}_1
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ -p_517 ∨ -b^{1, 518}_0
c  in DIMACS:
 2711  2712 -2713 -517 -2714 0
 2711  2712 -2713 -517  2715 0
 2711  2712 -2713 -517 -2716 0

c  2+1 --> break 
c    (-b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧  p_517) -> break
c  in CNF:
c     b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ -p_517 ∨ break
c  in DIMACS:
 2711 -2712  2713 -517 1162 0


c  2-1 --> 1
c    (-b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧ -p_517) -> (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0)
c  in CNF:
c     b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_2
c     b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_1
c     b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨  b^{1, 518}_0
c  in DIMACS:
 2711 -2712  2713  517 -2714 0
 2711 -2712  2713  517 -2715 0
 2711 -2712  2713  517  2716 0

c  1-1 --> 0
c    (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0 ∧ -p_517) -> (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧ -b^{1, 518}_0)
c  in CNF:
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_2
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_1
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_0
c  in DIMACS:
 2711  2712 -2713  517 -2714 0
 2711  2712 -2713  517 -2715 0
 2711  2712 -2713  517 -2716 0

c  0-1 --> -1
c    (-b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧ -p_517) -> ( b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0)
c  in CNF:
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨  b^{1, 518}_2
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_1
c     b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨  b^{1, 518}_0
c  in DIMACS:
 2711  2712  2713  517  2714 0
 2711  2712  2713  517 -2715 0
 2711  2712  2713  517  2716 0

c  -1-1 --> -2
c    ( b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧  b^{1, 517}_0 ∧ -p_517) -> ( b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0)
c  in CNF:
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨  b^{1, 518}_2
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨  b^{1, 518}_1
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨  p_517 ∨ -b^{1, 518}_0
c  in DIMACS:
-2711  2712 -2713  517  2714 0
-2711  2712 -2713  517  2715 0
-2711  2712 -2713  517 -2716 0

c  -2-1 --> break 
c    ( b^{1, 517}_2 ∧  b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧ -p_517) -> break
c  in CNF:
c    -b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨  b^{1, 517}_0 ∨  p_517 ∨ break
c  in DIMACS:
-2711 -2712  2713  517 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 517}_2 ∧ -b^{1, 517}_1 ∧ -b^{1, 517}_0 ∧ true) 
c  in CNF:
c    -b^{1, 517}_2 ∨  b^{1, 517}_1 ∨  b^{1, 517}_0 ∨ false 
c  in DIMACS:
-2711  2712  2713  0

c  3 does not represent an automaton state.
c    -(-b^{1, 517}_2 ∧  b^{1, 517}_1 ∧  b^{1, 517}_0 ∧ true) 
c  in CNF:
c     b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ false 
c  in DIMACS:
 2711 -2712 -2713  0
c  -3 does not represent an automaton state.
c    -( b^{1, 517}_2 ∧  b^{1, 517}_1 ∧  b^{1, 517}_0 ∧ true) 
c  in CNF:
c    -b^{1, 517}_2 ∨ -b^{1, 517}_1 ∨ -b^{1, 517}_0 ∨ false 
c  in DIMACS:
-2711 -2712 -2713  0

c i = 518
c  -2+1 --> -1
c    ( b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧  p_518) -> ( b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0)
c  in CNF:
c    -b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨  b^{1, 519}_2
c    -b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_1
c    -b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨  b^{1, 519}_0
c  in DIMACS:
-2714 -2715  2716 -518  2717 0
-2714 -2715  2716 -518 -2718 0
-2714 -2715  2716 -518  2719 0

c  -1+1 --> 0
c    ( b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0 ∧  p_518) -> (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧ -b^{1, 519}_0)
c  in CNF:
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_2
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_1
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_0
c  in DIMACS:
-2714  2715 -2716 -518 -2717 0
-2714  2715 -2716 -518 -2718 0
-2714  2715 -2716 -518 -2719 0

c  0+1 --> 1
c    (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧  p_518) -> (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0)
c  in CNF:
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_2
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_1
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨  b^{1, 519}_0
c  in DIMACS:
 2714  2715  2716 -518 -2717 0
 2714  2715  2716 -518 -2718 0
 2714  2715  2716 -518  2719 0

c  1+1 --> 2
c    (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0 ∧  p_518) -> (-b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0)
c  in CNF:
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_2
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨  b^{1, 519}_1
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ -p_518 ∨ -b^{1, 519}_0
c  in DIMACS:
 2714  2715 -2716 -518 -2717 0
 2714  2715 -2716 -518  2718 0
 2714  2715 -2716 -518 -2719 0

c  2+1 --> break 
c    (-b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧  p_518) -> break
c  in CNF:
c     b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 2714 -2715  2716 -518 1162 0


c  2-1 --> 1
c    (-b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧ -p_518) -> (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0)
c  in CNF:
c     b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_2
c     b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_1
c     b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨  b^{1, 519}_0
c  in DIMACS:
 2714 -2715  2716  518 -2717 0
 2714 -2715  2716  518 -2718 0
 2714 -2715  2716  518  2719 0

c  1-1 --> 0
c    (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0 ∧ -p_518) -> (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧ -b^{1, 519}_0)
c  in CNF:
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_2
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_1
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_0
c  in DIMACS:
 2714  2715 -2716  518 -2717 0
 2714  2715 -2716  518 -2718 0
 2714  2715 -2716  518 -2719 0

c  0-1 --> -1
c    (-b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧ -p_518) -> ( b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0)
c  in CNF:
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨  b^{1, 519}_2
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_1
c     b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨  b^{1, 519}_0
c  in DIMACS:
 2714  2715  2716  518  2717 0
 2714  2715  2716  518 -2718 0
 2714  2715  2716  518  2719 0

c  -1-1 --> -2
c    ( b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧  b^{1, 518}_0 ∧ -p_518) -> ( b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0)
c  in CNF:
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨  b^{1, 519}_2
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨  b^{1, 519}_1
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨  p_518 ∨ -b^{1, 519}_0
c  in DIMACS:
-2714  2715 -2716  518  2717 0
-2714  2715 -2716  518  2718 0
-2714  2715 -2716  518 -2719 0

c  -2-1 --> break 
c    ( b^{1, 518}_2 ∧  b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨  b^{1, 518}_0 ∨  p_518 ∨ break
c  in DIMACS:
-2714 -2715  2716  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 518}_2 ∧ -b^{1, 518}_1 ∧ -b^{1, 518}_0 ∧ true) 
c  in CNF:
c    -b^{1, 518}_2 ∨  b^{1, 518}_1 ∨  b^{1, 518}_0 ∨ false 
c  in DIMACS:
-2714  2715  2716  0

c  3 does not represent an automaton state.
c    -(-b^{1, 518}_2 ∧  b^{1, 518}_1 ∧  b^{1, 518}_0 ∧ true) 
c  in CNF:
c     b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ false 
c  in DIMACS:
 2714 -2715 -2716  0
c  -3 does not represent an automaton state.
c    -( b^{1, 518}_2 ∧  b^{1, 518}_1 ∧  b^{1, 518}_0 ∧ true) 
c  in CNF:
c    -b^{1, 518}_2 ∨ -b^{1, 518}_1 ∨ -b^{1, 518}_0 ∨ false 
c  in DIMACS:
-2714 -2715 -2716  0

c i = 519
c  -2+1 --> -1
c    ( b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧  p_519) -> ( b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0)
c  in CNF:
c    -b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨  b^{1, 520}_2
c    -b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_1
c    -b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨  b^{1, 520}_0
c  in DIMACS:
-2717 -2718  2719 -519  2720 0
-2717 -2718  2719 -519 -2721 0
-2717 -2718  2719 -519  2722 0

c  -1+1 --> 0
c    ( b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0 ∧  p_519) -> (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧ -b^{1, 520}_0)
c  in CNF:
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_2
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_1
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_0
c  in DIMACS:
-2717  2718 -2719 -519 -2720 0
-2717  2718 -2719 -519 -2721 0
-2717  2718 -2719 -519 -2722 0

c  0+1 --> 1
c    (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧  p_519) -> (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0)
c  in CNF:
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_2
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_1
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨  b^{1, 520}_0
c  in DIMACS:
 2717  2718  2719 -519 -2720 0
 2717  2718  2719 -519 -2721 0
 2717  2718  2719 -519  2722 0

c  1+1 --> 2
c    (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0 ∧  p_519) -> (-b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0)
c  in CNF:
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_2
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨  b^{1, 520}_1
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ -p_519 ∨ -b^{1, 520}_0
c  in DIMACS:
 2717  2718 -2719 -519 -2720 0
 2717  2718 -2719 -519  2721 0
 2717  2718 -2719 -519 -2722 0

c  2+1 --> break 
c    (-b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧  p_519) -> break
c  in CNF:
c     b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ -p_519 ∨ break
c  in DIMACS:
 2717 -2718  2719 -519 1162 0


c  2-1 --> 1
c    (-b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧ -p_519) -> (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0)
c  in CNF:
c     b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_2
c     b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_1
c     b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨  b^{1, 520}_0
c  in DIMACS:
 2717 -2718  2719  519 -2720 0
 2717 -2718  2719  519 -2721 0
 2717 -2718  2719  519  2722 0

c  1-1 --> 0
c    (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0 ∧ -p_519) -> (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧ -b^{1, 520}_0)
c  in CNF:
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_2
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_1
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_0
c  in DIMACS:
 2717  2718 -2719  519 -2720 0
 2717  2718 -2719  519 -2721 0
 2717  2718 -2719  519 -2722 0

c  0-1 --> -1
c    (-b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧ -p_519) -> ( b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0)
c  in CNF:
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨  b^{1, 520}_2
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_1
c     b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨  b^{1, 520}_0
c  in DIMACS:
 2717  2718  2719  519  2720 0
 2717  2718  2719  519 -2721 0
 2717  2718  2719  519  2722 0

c  -1-1 --> -2
c    ( b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧  b^{1, 519}_0 ∧ -p_519) -> ( b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0)
c  in CNF:
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨  b^{1, 520}_2
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨  b^{1, 520}_1
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨  p_519 ∨ -b^{1, 520}_0
c  in DIMACS:
-2717  2718 -2719  519  2720 0
-2717  2718 -2719  519  2721 0
-2717  2718 -2719  519 -2722 0

c  -2-1 --> break 
c    ( b^{1, 519}_2 ∧  b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧ -p_519) -> break
c  in CNF:
c    -b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨  b^{1, 519}_0 ∨  p_519 ∨ break
c  in DIMACS:
-2717 -2718  2719  519 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 519}_2 ∧ -b^{1, 519}_1 ∧ -b^{1, 519}_0 ∧ true) 
c  in CNF:
c    -b^{1, 519}_2 ∨  b^{1, 519}_1 ∨  b^{1, 519}_0 ∨ false 
c  in DIMACS:
-2717  2718  2719  0

c  3 does not represent an automaton state.
c    -(-b^{1, 519}_2 ∧  b^{1, 519}_1 ∧  b^{1, 519}_0 ∧ true) 
c  in CNF:
c     b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ false 
c  in DIMACS:
 2717 -2718 -2719  0
c  -3 does not represent an automaton state.
c    -( b^{1, 519}_2 ∧  b^{1, 519}_1 ∧  b^{1, 519}_0 ∧ true) 
c  in CNF:
c    -b^{1, 519}_2 ∨ -b^{1, 519}_1 ∨ -b^{1, 519}_0 ∨ false 
c  in DIMACS:
-2717 -2718 -2719  0

c i = 520
c  -2+1 --> -1
c    ( b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧  p_520) -> ( b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0)
c  in CNF:
c    -b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨  b^{1, 521}_2
c    -b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_1
c    -b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨  b^{1, 521}_0
c  in DIMACS:
-2720 -2721  2722 -520  2723 0
-2720 -2721  2722 -520 -2724 0
-2720 -2721  2722 -520  2725 0

c  -1+1 --> 0
c    ( b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0 ∧  p_520) -> (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧ -b^{1, 521}_0)
c  in CNF:
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_2
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_1
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_0
c  in DIMACS:
-2720  2721 -2722 -520 -2723 0
-2720  2721 -2722 -520 -2724 0
-2720  2721 -2722 -520 -2725 0

c  0+1 --> 1
c    (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧  p_520) -> (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0)
c  in CNF:
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_2
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_1
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨  b^{1, 521}_0
c  in DIMACS:
 2720  2721  2722 -520 -2723 0
 2720  2721  2722 -520 -2724 0
 2720  2721  2722 -520  2725 0

c  1+1 --> 2
c    (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0 ∧  p_520) -> (-b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0)
c  in CNF:
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_2
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨  b^{1, 521}_1
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ -p_520 ∨ -b^{1, 521}_0
c  in DIMACS:
 2720  2721 -2722 -520 -2723 0
 2720  2721 -2722 -520  2724 0
 2720  2721 -2722 -520 -2725 0

c  2+1 --> break 
c    (-b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧  p_520) -> break
c  in CNF:
c     b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 2720 -2721  2722 -520 1162 0


c  2-1 --> 1
c    (-b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧ -p_520) -> (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0)
c  in CNF:
c     b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_2
c     b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_1
c     b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨  b^{1, 521}_0
c  in DIMACS:
 2720 -2721  2722  520 -2723 0
 2720 -2721  2722  520 -2724 0
 2720 -2721  2722  520  2725 0

c  1-1 --> 0
c    (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0 ∧ -p_520) -> (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧ -b^{1, 521}_0)
c  in CNF:
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_2
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_1
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_0
c  in DIMACS:
 2720  2721 -2722  520 -2723 0
 2720  2721 -2722  520 -2724 0
 2720  2721 -2722  520 -2725 0

c  0-1 --> -1
c    (-b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧ -p_520) -> ( b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0)
c  in CNF:
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨  b^{1, 521}_2
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_1
c     b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨  b^{1, 521}_0
c  in DIMACS:
 2720  2721  2722  520  2723 0
 2720  2721  2722  520 -2724 0
 2720  2721  2722  520  2725 0

c  -1-1 --> -2
c    ( b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧  b^{1, 520}_0 ∧ -p_520) -> ( b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0)
c  in CNF:
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨  b^{1, 521}_2
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨  b^{1, 521}_1
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨  p_520 ∨ -b^{1, 521}_0
c  in DIMACS:
-2720  2721 -2722  520  2723 0
-2720  2721 -2722  520  2724 0
-2720  2721 -2722  520 -2725 0

c  -2-1 --> break 
c    ( b^{1, 520}_2 ∧  b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨  b^{1, 520}_0 ∨  p_520 ∨ break
c  in DIMACS:
-2720 -2721  2722  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 520}_2 ∧ -b^{1, 520}_1 ∧ -b^{1, 520}_0 ∧ true) 
c  in CNF:
c    -b^{1, 520}_2 ∨  b^{1, 520}_1 ∨  b^{1, 520}_0 ∨ false 
c  in DIMACS:
-2720  2721  2722  0

c  3 does not represent an automaton state.
c    -(-b^{1, 520}_2 ∧  b^{1, 520}_1 ∧  b^{1, 520}_0 ∧ true) 
c  in CNF:
c     b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ false 
c  in DIMACS:
 2720 -2721 -2722  0
c  -3 does not represent an automaton state.
c    -( b^{1, 520}_2 ∧  b^{1, 520}_1 ∧  b^{1, 520}_0 ∧ true) 
c  in CNF:
c    -b^{1, 520}_2 ∨ -b^{1, 520}_1 ∨ -b^{1, 520}_0 ∨ false 
c  in DIMACS:
-2720 -2721 -2722  0

c i = 521
c  -2+1 --> -1
c    ( b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧  p_521) -> ( b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0)
c  in CNF:
c    -b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨  b^{1, 522}_2
c    -b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_1
c    -b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨  b^{1, 522}_0
c  in DIMACS:
-2723 -2724  2725 -521  2726 0
-2723 -2724  2725 -521 -2727 0
-2723 -2724  2725 -521  2728 0

c  -1+1 --> 0
c    ( b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0 ∧  p_521) -> (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧ -b^{1, 522}_0)
c  in CNF:
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_2
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_1
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_0
c  in DIMACS:
-2723  2724 -2725 -521 -2726 0
-2723  2724 -2725 -521 -2727 0
-2723  2724 -2725 -521 -2728 0

c  0+1 --> 1
c    (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧  p_521) -> (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0)
c  in CNF:
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_2
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_1
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨  b^{1, 522}_0
c  in DIMACS:
 2723  2724  2725 -521 -2726 0
 2723  2724  2725 -521 -2727 0
 2723  2724  2725 -521  2728 0

c  1+1 --> 2
c    (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0 ∧  p_521) -> (-b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0)
c  in CNF:
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_2
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨  b^{1, 522}_1
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ -p_521 ∨ -b^{1, 522}_0
c  in DIMACS:
 2723  2724 -2725 -521 -2726 0
 2723  2724 -2725 -521  2727 0
 2723  2724 -2725 -521 -2728 0

c  2+1 --> break 
c    (-b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧  p_521) -> break
c  in CNF:
c     b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ -p_521 ∨ break
c  in DIMACS:
 2723 -2724  2725 -521 1162 0


c  2-1 --> 1
c    (-b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧ -p_521) -> (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0)
c  in CNF:
c     b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_2
c     b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_1
c     b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨  b^{1, 522}_0
c  in DIMACS:
 2723 -2724  2725  521 -2726 0
 2723 -2724  2725  521 -2727 0
 2723 -2724  2725  521  2728 0

c  1-1 --> 0
c    (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0 ∧ -p_521) -> (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧ -b^{1, 522}_0)
c  in CNF:
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_2
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_1
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_0
c  in DIMACS:
 2723  2724 -2725  521 -2726 0
 2723  2724 -2725  521 -2727 0
 2723  2724 -2725  521 -2728 0

c  0-1 --> -1
c    (-b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧ -p_521) -> ( b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0)
c  in CNF:
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨  b^{1, 522}_2
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_1
c     b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨  b^{1, 522}_0
c  in DIMACS:
 2723  2724  2725  521  2726 0
 2723  2724  2725  521 -2727 0
 2723  2724  2725  521  2728 0

c  -1-1 --> -2
c    ( b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧  b^{1, 521}_0 ∧ -p_521) -> ( b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0)
c  in CNF:
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨  b^{1, 522}_2
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨  b^{1, 522}_1
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨  p_521 ∨ -b^{1, 522}_0
c  in DIMACS:
-2723  2724 -2725  521  2726 0
-2723  2724 -2725  521  2727 0
-2723  2724 -2725  521 -2728 0

c  -2-1 --> break 
c    ( b^{1, 521}_2 ∧  b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧ -p_521) -> break
c  in CNF:
c    -b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨  b^{1, 521}_0 ∨  p_521 ∨ break
c  in DIMACS:
-2723 -2724  2725  521 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 521}_2 ∧ -b^{1, 521}_1 ∧ -b^{1, 521}_0 ∧ true) 
c  in CNF:
c    -b^{1, 521}_2 ∨  b^{1, 521}_1 ∨  b^{1, 521}_0 ∨ false 
c  in DIMACS:
-2723  2724  2725  0

c  3 does not represent an automaton state.
c    -(-b^{1, 521}_2 ∧  b^{1, 521}_1 ∧  b^{1, 521}_0 ∧ true) 
c  in CNF:
c     b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ false 
c  in DIMACS:
 2723 -2724 -2725  0
c  -3 does not represent an automaton state.
c    -( b^{1, 521}_2 ∧  b^{1, 521}_1 ∧  b^{1, 521}_0 ∧ true) 
c  in CNF:
c    -b^{1, 521}_2 ∨ -b^{1, 521}_1 ∨ -b^{1, 521}_0 ∨ false 
c  in DIMACS:
-2723 -2724 -2725  0

c i = 522
c  -2+1 --> -1
c    ( b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧  p_522) -> ( b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0)
c  in CNF:
c    -b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨  b^{1, 523}_2
c    -b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_1
c    -b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨  b^{1, 523}_0
c  in DIMACS:
-2726 -2727  2728 -522  2729 0
-2726 -2727  2728 -522 -2730 0
-2726 -2727  2728 -522  2731 0

c  -1+1 --> 0
c    ( b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0 ∧  p_522) -> (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧ -b^{1, 523}_0)
c  in CNF:
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_2
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_1
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_0
c  in DIMACS:
-2726  2727 -2728 -522 -2729 0
-2726  2727 -2728 -522 -2730 0
-2726  2727 -2728 -522 -2731 0

c  0+1 --> 1
c    (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧  p_522) -> (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0)
c  in CNF:
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_2
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_1
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨  b^{1, 523}_0
c  in DIMACS:
 2726  2727  2728 -522 -2729 0
 2726  2727  2728 -522 -2730 0
 2726  2727  2728 -522  2731 0

c  1+1 --> 2
c    (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0 ∧  p_522) -> (-b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0)
c  in CNF:
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_2
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨  b^{1, 523}_1
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ -p_522 ∨ -b^{1, 523}_0
c  in DIMACS:
 2726  2727 -2728 -522 -2729 0
 2726  2727 -2728 -522  2730 0
 2726  2727 -2728 -522 -2731 0

c  2+1 --> break 
c    (-b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧  p_522) -> break
c  in CNF:
c     b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 2726 -2727  2728 -522 1162 0


c  2-1 --> 1
c    (-b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧ -p_522) -> (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0)
c  in CNF:
c     b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_2
c     b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_1
c     b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨  b^{1, 523}_0
c  in DIMACS:
 2726 -2727  2728  522 -2729 0
 2726 -2727  2728  522 -2730 0
 2726 -2727  2728  522  2731 0

c  1-1 --> 0
c    (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0 ∧ -p_522) -> (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧ -b^{1, 523}_0)
c  in CNF:
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_2
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_1
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_0
c  in DIMACS:
 2726  2727 -2728  522 -2729 0
 2726  2727 -2728  522 -2730 0
 2726  2727 -2728  522 -2731 0

c  0-1 --> -1
c    (-b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧ -p_522) -> ( b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0)
c  in CNF:
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨  b^{1, 523}_2
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_1
c     b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨  b^{1, 523}_0
c  in DIMACS:
 2726  2727  2728  522  2729 0
 2726  2727  2728  522 -2730 0
 2726  2727  2728  522  2731 0

c  -1-1 --> -2
c    ( b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧  b^{1, 522}_0 ∧ -p_522) -> ( b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0)
c  in CNF:
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨  b^{1, 523}_2
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨  b^{1, 523}_1
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨  p_522 ∨ -b^{1, 523}_0
c  in DIMACS:
-2726  2727 -2728  522  2729 0
-2726  2727 -2728  522  2730 0
-2726  2727 -2728  522 -2731 0

c  -2-1 --> break 
c    ( b^{1, 522}_2 ∧  b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨  b^{1, 522}_0 ∨  p_522 ∨ break
c  in DIMACS:
-2726 -2727  2728  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 522}_2 ∧ -b^{1, 522}_1 ∧ -b^{1, 522}_0 ∧ true) 
c  in CNF:
c    -b^{1, 522}_2 ∨  b^{1, 522}_1 ∨  b^{1, 522}_0 ∨ false 
c  in DIMACS:
-2726  2727  2728  0

c  3 does not represent an automaton state.
c    -(-b^{1, 522}_2 ∧  b^{1, 522}_1 ∧  b^{1, 522}_0 ∧ true) 
c  in CNF:
c     b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ false 
c  in DIMACS:
 2726 -2727 -2728  0
c  -3 does not represent an automaton state.
c    -( b^{1, 522}_2 ∧  b^{1, 522}_1 ∧  b^{1, 522}_0 ∧ true) 
c  in CNF:
c    -b^{1, 522}_2 ∨ -b^{1, 522}_1 ∨ -b^{1, 522}_0 ∨ false 
c  in DIMACS:
-2726 -2727 -2728  0

c i = 523
c  -2+1 --> -1
c    ( b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧  p_523) -> ( b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0)
c  in CNF:
c    -b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨  b^{1, 524}_2
c    -b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_1
c    -b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨  b^{1, 524}_0
c  in DIMACS:
-2729 -2730  2731 -523  2732 0
-2729 -2730  2731 -523 -2733 0
-2729 -2730  2731 -523  2734 0

c  -1+1 --> 0
c    ( b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0 ∧  p_523) -> (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧ -b^{1, 524}_0)
c  in CNF:
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_2
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_1
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_0
c  in DIMACS:
-2729  2730 -2731 -523 -2732 0
-2729  2730 -2731 -523 -2733 0
-2729  2730 -2731 -523 -2734 0

c  0+1 --> 1
c    (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧  p_523) -> (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0)
c  in CNF:
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_2
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_1
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨  b^{1, 524}_0
c  in DIMACS:
 2729  2730  2731 -523 -2732 0
 2729  2730  2731 -523 -2733 0
 2729  2730  2731 -523  2734 0

c  1+1 --> 2
c    (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0 ∧  p_523) -> (-b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0)
c  in CNF:
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_2
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨  b^{1, 524}_1
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ -p_523 ∨ -b^{1, 524}_0
c  in DIMACS:
 2729  2730 -2731 -523 -2732 0
 2729  2730 -2731 -523  2733 0
 2729  2730 -2731 -523 -2734 0

c  2+1 --> break 
c    (-b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧  p_523) -> break
c  in CNF:
c     b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ -p_523 ∨ break
c  in DIMACS:
 2729 -2730  2731 -523 1162 0


c  2-1 --> 1
c    (-b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧ -p_523) -> (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0)
c  in CNF:
c     b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_2
c     b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_1
c     b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨  b^{1, 524}_0
c  in DIMACS:
 2729 -2730  2731  523 -2732 0
 2729 -2730  2731  523 -2733 0
 2729 -2730  2731  523  2734 0

c  1-1 --> 0
c    (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0 ∧ -p_523) -> (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧ -b^{1, 524}_0)
c  in CNF:
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_2
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_1
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_0
c  in DIMACS:
 2729  2730 -2731  523 -2732 0
 2729  2730 -2731  523 -2733 0
 2729  2730 -2731  523 -2734 0

c  0-1 --> -1
c    (-b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧ -p_523) -> ( b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0)
c  in CNF:
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨  b^{1, 524}_2
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_1
c     b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨  b^{1, 524}_0
c  in DIMACS:
 2729  2730  2731  523  2732 0
 2729  2730  2731  523 -2733 0
 2729  2730  2731  523  2734 0

c  -1-1 --> -2
c    ( b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧  b^{1, 523}_0 ∧ -p_523) -> ( b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0)
c  in CNF:
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨  b^{1, 524}_2
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨  b^{1, 524}_1
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨  p_523 ∨ -b^{1, 524}_0
c  in DIMACS:
-2729  2730 -2731  523  2732 0
-2729  2730 -2731  523  2733 0
-2729  2730 -2731  523 -2734 0

c  -2-1 --> break 
c    ( b^{1, 523}_2 ∧  b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧ -p_523) -> break
c  in CNF:
c    -b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨  b^{1, 523}_0 ∨  p_523 ∨ break
c  in DIMACS:
-2729 -2730  2731  523 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 523}_2 ∧ -b^{1, 523}_1 ∧ -b^{1, 523}_0 ∧ true) 
c  in CNF:
c    -b^{1, 523}_2 ∨  b^{1, 523}_1 ∨  b^{1, 523}_0 ∨ false 
c  in DIMACS:
-2729  2730  2731  0

c  3 does not represent an automaton state.
c    -(-b^{1, 523}_2 ∧  b^{1, 523}_1 ∧  b^{1, 523}_0 ∧ true) 
c  in CNF:
c     b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ false 
c  in DIMACS:
 2729 -2730 -2731  0
c  -3 does not represent an automaton state.
c    -( b^{1, 523}_2 ∧  b^{1, 523}_1 ∧  b^{1, 523}_0 ∧ true) 
c  in CNF:
c    -b^{1, 523}_2 ∨ -b^{1, 523}_1 ∨ -b^{1, 523}_0 ∨ false 
c  in DIMACS:
-2729 -2730 -2731  0

c i = 524
c  -2+1 --> -1
c    ( b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧  p_524) -> ( b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0)
c  in CNF:
c    -b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨  b^{1, 525}_2
c    -b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_1
c    -b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨  b^{1, 525}_0
c  in DIMACS:
-2732 -2733  2734 -524  2735 0
-2732 -2733  2734 -524 -2736 0
-2732 -2733  2734 -524  2737 0

c  -1+1 --> 0
c    ( b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0 ∧  p_524) -> (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧ -b^{1, 525}_0)
c  in CNF:
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_2
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_1
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_0
c  in DIMACS:
-2732  2733 -2734 -524 -2735 0
-2732  2733 -2734 -524 -2736 0
-2732  2733 -2734 -524 -2737 0

c  0+1 --> 1
c    (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧  p_524) -> (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0)
c  in CNF:
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_2
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_1
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨  b^{1, 525}_0
c  in DIMACS:
 2732  2733  2734 -524 -2735 0
 2732  2733  2734 -524 -2736 0
 2732  2733  2734 -524  2737 0

c  1+1 --> 2
c    (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0 ∧  p_524) -> (-b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0)
c  in CNF:
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_2
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨  b^{1, 525}_1
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ -p_524 ∨ -b^{1, 525}_0
c  in DIMACS:
 2732  2733 -2734 -524 -2735 0
 2732  2733 -2734 -524  2736 0
 2732  2733 -2734 -524 -2737 0

c  2+1 --> break 
c    (-b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧  p_524) -> break
c  in CNF:
c     b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ -p_524 ∨ break
c  in DIMACS:
 2732 -2733  2734 -524 1162 0


c  2-1 --> 1
c    (-b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧ -p_524) -> (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0)
c  in CNF:
c     b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_2
c     b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_1
c     b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨  b^{1, 525}_0
c  in DIMACS:
 2732 -2733  2734  524 -2735 0
 2732 -2733  2734  524 -2736 0
 2732 -2733  2734  524  2737 0

c  1-1 --> 0
c    (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0 ∧ -p_524) -> (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧ -b^{1, 525}_0)
c  in CNF:
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_2
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_1
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_0
c  in DIMACS:
 2732  2733 -2734  524 -2735 0
 2732  2733 -2734  524 -2736 0
 2732  2733 -2734  524 -2737 0

c  0-1 --> -1
c    (-b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧ -p_524) -> ( b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0)
c  in CNF:
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨  b^{1, 525}_2
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_1
c     b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨  b^{1, 525}_0
c  in DIMACS:
 2732  2733  2734  524  2735 0
 2732  2733  2734  524 -2736 0
 2732  2733  2734  524  2737 0

c  -1-1 --> -2
c    ( b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧  b^{1, 524}_0 ∧ -p_524) -> ( b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0)
c  in CNF:
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨  b^{1, 525}_2
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨  b^{1, 525}_1
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨  p_524 ∨ -b^{1, 525}_0
c  in DIMACS:
-2732  2733 -2734  524  2735 0
-2732  2733 -2734  524  2736 0
-2732  2733 -2734  524 -2737 0

c  -2-1 --> break 
c    ( b^{1, 524}_2 ∧  b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧ -p_524) -> break
c  in CNF:
c    -b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨  b^{1, 524}_0 ∨  p_524 ∨ break
c  in DIMACS:
-2732 -2733  2734  524 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 524}_2 ∧ -b^{1, 524}_1 ∧ -b^{1, 524}_0 ∧ true) 
c  in CNF:
c    -b^{1, 524}_2 ∨  b^{1, 524}_1 ∨  b^{1, 524}_0 ∨ false 
c  in DIMACS:
-2732  2733  2734  0

c  3 does not represent an automaton state.
c    -(-b^{1, 524}_2 ∧  b^{1, 524}_1 ∧  b^{1, 524}_0 ∧ true) 
c  in CNF:
c     b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ false 
c  in DIMACS:
 2732 -2733 -2734  0
c  -3 does not represent an automaton state.
c    -( b^{1, 524}_2 ∧  b^{1, 524}_1 ∧  b^{1, 524}_0 ∧ true) 
c  in CNF:
c    -b^{1, 524}_2 ∨ -b^{1, 524}_1 ∨ -b^{1, 524}_0 ∨ false 
c  in DIMACS:
-2732 -2733 -2734  0

c i = 525
c  -2+1 --> -1
c    ( b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧  p_525) -> ( b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0)
c  in CNF:
c    -b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨  b^{1, 526}_2
c    -b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_1
c    -b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨  b^{1, 526}_0
c  in DIMACS:
-2735 -2736  2737 -525  2738 0
-2735 -2736  2737 -525 -2739 0
-2735 -2736  2737 -525  2740 0

c  -1+1 --> 0
c    ( b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0 ∧  p_525) -> (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧ -b^{1, 526}_0)
c  in CNF:
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_2
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_1
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_0
c  in DIMACS:
-2735  2736 -2737 -525 -2738 0
-2735  2736 -2737 -525 -2739 0
-2735  2736 -2737 -525 -2740 0

c  0+1 --> 1
c    (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧  p_525) -> (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0)
c  in CNF:
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_2
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_1
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨  b^{1, 526}_0
c  in DIMACS:
 2735  2736  2737 -525 -2738 0
 2735  2736  2737 -525 -2739 0
 2735  2736  2737 -525  2740 0

c  1+1 --> 2
c    (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0 ∧  p_525) -> (-b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0)
c  in CNF:
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_2
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨  b^{1, 526}_1
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ -p_525 ∨ -b^{1, 526}_0
c  in DIMACS:
 2735  2736 -2737 -525 -2738 0
 2735  2736 -2737 -525  2739 0
 2735  2736 -2737 -525 -2740 0

c  2+1 --> break 
c    (-b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧  p_525) -> break
c  in CNF:
c     b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 2735 -2736  2737 -525 1162 0


c  2-1 --> 1
c    (-b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧ -p_525) -> (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0)
c  in CNF:
c     b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_2
c     b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_1
c     b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨  b^{1, 526}_0
c  in DIMACS:
 2735 -2736  2737  525 -2738 0
 2735 -2736  2737  525 -2739 0
 2735 -2736  2737  525  2740 0

c  1-1 --> 0
c    (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0 ∧ -p_525) -> (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧ -b^{1, 526}_0)
c  in CNF:
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_2
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_1
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_0
c  in DIMACS:
 2735  2736 -2737  525 -2738 0
 2735  2736 -2737  525 -2739 0
 2735  2736 -2737  525 -2740 0

c  0-1 --> -1
c    (-b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧ -p_525) -> ( b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0)
c  in CNF:
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨  b^{1, 526}_2
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_1
c     b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨  b^{1, 526}_0
c  in DIMACS:
 2735  2736  2737  525  2738 0
 2735  2736  2737  525 -2739 0
 2735  2736  2737  525  2740 0

c  -1-1 --> -2
c    ( b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧  b^{1, 525}_0 ∧ -p_525) -> ( b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0)
c  in CNF:
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨  b^{1, 526}_2
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨  b^{1, 526}_1
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨  p_525 ∨ -b^{1, 526}_0
c  in DIMACS:
-2735  2736 -2737  525  2738 0
-2735  2736 -2737  525  2739 0
-2735  2736 -2737  525 -2740 0

c  -2-1 --> break 
c    ( b^{1, 525}_2 ∧  b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨  b^{1, 525}_0 ∨  p_525 ∨ break
c  in DIMACS:
-2735 -2736  2737  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 525}_2 ∧ -b^{1, 525}_1 ∧ -b^{1, 525}_0 ∧ true) 
c  in CNF:
c    -b^{1, 525}_2 ∨  b^{1, 525}_1 ∨  b^{1, 525}_0 ∨ false 
c  in DIMACS:
-2735  2736  2737  0

c  3 does not represent an automaton state.
c    -(-b^{1, 525}_2 ∧  b^{1, 525}_1 ∧  b^{1, 525}_0 ∧ true) 
c  in CNF:
c     b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ false 
c  in DIMACS:
 2735 -2736 -2737  0
c  -3 does not represent an automaton state.
c    -( b^{1, 525}_2 ∧  b^{1, 525}_1 ∧  b^{1, 525}_0 ∧ true) 
c  in CNF:
c    -b^{1, 525}_2 ∨ -b^{1, 525}_1 ∨ -b^{1, 525}_0 ∨ false 
c  in DIMACS:
-2735 -2736 -2737  0

c i = 526
c  -2+1 --> -1
c    ( b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧  p_526) -> ( b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0)
c  in CNF:
c    -b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨  b^{1, 527}_2
c    -b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_1
c    -b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨  b^{1, 527}_0
c  in DIMACS:
-2738 -2739  2740 -526  2741 0
-2738 -2739  2740 -526 -2742 0
-2738 -2739  2740 -526  2743 0

c  -1+1 --> 0
c    ( b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0 ∧  p_526) -> (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧ -b^{1, 527}_0)
c  in CNF:
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_2
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_1
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_0
c  in DIMACS:
-2738  2739 -2740 -526 -2741 0
-2738  2739 -2740 -526 -2742 0
-2738  2739 -2740 -526 -2743 0

c  0+1 --> 1
c    (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧  p_526) -> (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0)
c  in CNF:
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_2
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_1
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨  b^{1, 527}_0
c  in DIMACS:
 2738  2739  2740 -526 -2741 0
 2738  2739  2740 -526 -2742 0
 2738  2739  2740 -526  2743 0

c  1+1 --> 2
c    (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0 ∧  p_526) -> (-b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0)
c  in CNF:
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_2
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨  b^{1, 527}_1
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ -p_526 ∨ -b^{1, 527}_0
c  in DIMACS:
 2738  2739 -2740 -526 -2741 0
 2738  2739 -2740 -526  2742 0
 2738  2739 -2740 -526 -2743 0

c  2+1 --> break 
c    (-b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧  p_526) -> break
c  in CNF:
c     b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ -p_526 ∨ break
c  in DIMACS:
 2738 -2739  2740 -526 1162 0


c  2-1 --> 1
c    (-b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧ -p_526) -> (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0)
c  in CNF:
c     b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_2
c     b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_1
c     b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨  b^{1, 527}_0
c  in DIMACS:
 2738 -2739  2740  526 -2741 0
 2738 -2739  2740  526 -2742 0
 2738 -2739  2740  526  2743 0

c  1-1 --> 0
c    (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0 ∧ -p_526) -> (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧ -b^{1, 527}_0)
c  in CNF:
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_2
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_1
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_0
c  in DIMACS:
 2738  2739 -2740  526 -2741 0
 2738  2739 -2740  526 -2742 0
 2738  2739 -2740  526 -2743 0

c  0-1 --> -1
c    (-b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧ -p_526) -> ( b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0)
c  in CNF:
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨  b^{1, 527}_2
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_1
c     b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨  b^{1, 527}_0
c  in DIMACS:
 2738  2739  2740  526  2741 0
 2738  2739  2740  526 -2742 0
 2738  2739  2740  526  2743 0

c  -1-1 --> -2
c    ( b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧  b^{1, 526}_0 ∧ -p_526) -> ( b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0)
c  in CNF:
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨  b^{1, 527}_2
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨  b^{1, 527}_1
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨  p_526 ∨ -b^{1, 527}_0
c  in DIMACS:
-2738  2739 -2740  526  2741 0
-2738  2739 -2740  526  2742 0
-2738  2739 -2740  526 -2743 0

c  -2-1 --> break 
c    ( b^{1, 526}_2 ∧  b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧ -p_526) -> break
c  in CNF:
c    -b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨  b^{1, 526}_0 ∨  p_526 ∨ break
c  in DIMACS:
-2738 -2739  2740  526 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 526}_2 ∧ -b^{1, 526}_1 ∧ -b^{1, 526}_0 ∧ true) 
c  in CNF:
c    -b^{1, 526}_2 ∨  b^{1, 526}_1 ∨  b^{1, 526}_0 ∨ false 
c  in DIMACS:
-2738  2739  2740  0

c  3 does not represent an automaton state.
c    -(-b^{1, 526}_2 ∧  b^{1, 526}_1 ∧  b^{1, 526}_0 ∧ true) 
c  in CNF:
c     b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ false 
c  in DIMACS:
 2738 -2739 -2740  0
c  -3 does not represent an automaton state.
c    -( b^{1, 526}_2 ∧  b^{1, 526}_1 ∧  b^{1, 526}_0 ∧ true) 
c  in CNF:
c    -b^{1, 526}_2 ∨ -b^{1, 526}_1 ∨ -b^{1, 526}_0 ∨ false 
c  in DIMACS:
-2738 -2739 -2740  0

c i = 527
c  -2+1 --> -1
c    ( b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧  p_527) -> ( b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0)
c  in CNF:
c    -b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨  b^{1, 528}_2
c    -b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_1
c    -b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨  b^{1, 528}_0
c  in DIMACS:
-2741 -2742  2743 -527  2744 0
-2741 -2742  2743 -527 -2745 0
-2741 -2742  2743 -527  2746 0

c  -1+1 --> 0
c    ( b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0 ∧  p_527) -> (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧ -b^{1, 528}_0)
c  in CNF:
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_2
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_1
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_0
c  in DIMACS:
-2741  2742 -2743 -527 -2744 0
-2741  2742 -2743 -527 -2745 0
-2741  2742 -2743 -527 -2746 0

c  0+1 --> 1
c    (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧  p_527) -> (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0)
c  in CNF:
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_2
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_1
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨  b^{1, 528}_0
c  in DIMACS:
 2741  2742  2743 -527 -2744 0
 2741  2742  2743 -527 -2745 0
 2741  2742  2743 -527  2746 0

c  1+1 --> 2
c    (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0 ∧  p_527) -> (-b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0)
c  in CNF:
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_2
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨  b^{1, 528}_1
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ -p_527 ∨ -b^{1, 528}_0
c  in DIMACS:
 2741  2742 -2743 -527 -2744 0
 2741  2742 -2743 -527  2745 0
 2741  2742 -2743 -527 -2746 0

c  2+1 --> break 
c    (-b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧  p_527) -> break
c  in CNF:
c     b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ -p_527 ∨ break
c  in DIMACS:
 2741 -2742  2743 -527 1162 0


c  2-1 --> 1
c    (-b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧ -p_527) -> (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0)
c  in CNF:
c     b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_2
c     b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_1
c     b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨  b^{1, 528}_0
c  in DIMACS:
 2741 -2742  2743  527 -2744 0
 2741 -2742  2743  527 -2745 0
 2741 -2742  2743  527  2746 0

c  1-1 --> 0
c    (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0 ∧ -p_527) -> (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧ -b^{1, 528}_0)
c  in CNF:
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_2
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_1
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_0
c  in DIMACS:
 2741  2742 -2743  527 -2744 0
 2741  2742 -2743  527 -2745 0
 2741  2742 -2743  527 -2746 0

c  0-1 --> -1
c    (-b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧ -p_527) -> ( b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0)
c  in CNF:
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨  b^{1, 528}_2
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_1
c     b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨  b^{1, 528}_0
c  in DIMACS:
 2741  2742  2743  527  2744 0
 2741  2742  2743  527 -2745 0
 2741  2742  2743  527  2746 0

c  -1-1 --> -2
c    ( b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧  b^{1, 527}_0 ∧ -p_527) -> ( b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0)
c  in CNF:
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨  b^{1, 528}_2
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨  b^{1, 528}_1
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨  p_527 ∨ -b^{1, 528}_0
c  in DIMACS:
-2741  2742 -2743  527  2744 0
-2741  2742 -2743  527  2745 0
-2741  2742 -2743  527 -2746 0

c  -2-1 --> break 
c    ( b^{1, 527}_2 ∧  b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧ -p_527) -> break
c  in CNF:
c    -b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨  b^{1, 527}_0 ∨  p_527 ∨ break
c  in DIMACS:
-2741 -2742  2743  527 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 527}_2 ∧ -b^{1, 527}_1 ∧ -b^{1, 527}_0 ∧ true) 
c  in CNF:
c    -b^{1, 527}_2 ∨  b^{1, 527}_1 ∨  b^{1, 527}_0 ∨ false 
c  in DIMACS:
-2741  2742  2743  0

c  3 does not represent an automaton state.
c    -(-b^{1, 527}_2 ∧  b^{1, 527}_1 ∧  b^{1, 527}_0 ∧ true) 
c  in CNF:
c     b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ false 
c  in DIMACS:
 2741 -2742 -2743  0
c  -3 does not represent an automaton state.
c    -( b^{1, 527}_2 ∧  b^{1, 527}_1 ∧  b^{1, 527}_0 ∧ true) 
c  in CNF:
c    -b^{1, 527}_2 ∨ -b^{1, 527}_1 ∨ -b^{1, 527}_0 ∨ false 
c  in DIMACS:
-2741 -2742 -2743  0

c i = 528
c  -2+1 --> -1
c    ( b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧  p_528) -> ( b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0)
c  in CNF:
c    -b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨  b^{1, 529}_2
c    -b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_1
c    -b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨  b^{1, 529}_0
c  in DIMACS:
-2744 -2745  2746 -528  2747 0
-2744 -2745  2746 -528 -2748 0
-2744 -2745  2746 -528  2749 0

c  -1+1 --> 0
c    ( b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0 ∧  p_528) -> (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧ -b^{1, 529}_0)
c  in CNF:
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_2
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_1
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_0
c  in DIMACS:
-2744  2745 -2746 -528 -2747 0
-2744  2745 -2746 -528 -2748 0
-2744  2745 -2746 -528 -2749 0

c  0+1 --> 1
c    (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧  p_528) -> (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0)
c  in CNF:
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_2
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_1
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨  b^{1, 529}_0
c  in DIMACS:
 2744  2745  2746 -528 -2747 0
 2744  2745  2746 -528 -2748 0
 2744  2745  2746 -528  2749 0

c  1+1 --> 2
c    (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0 ∧  p_528) -> (-b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0)
c  in CNF:
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_2
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨  b^{1, 529}_1
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ -p_528 ∨ -b^{1, 529}_0
c  in DIMACS:
 2744  2745 -2746 -528 -2747 0
 2744  2745 -2746 -528  2748 0
 2744  2745 -2746 -528 -2749 0

c  2+1 --> break 
c    (-b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧  p_528) -> break
c  in CNF:
c     b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 2744 -2745  2746 -528 1162 0


c  2-1 --> 1
c    (-b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧ -p_528) -> (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0)
c  in CNF:
c     b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_2
c     b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_1
c     b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨  b^{1, 529}_0
c  in DIMACS:
 2744 -2745  2746  528 -2747 0
 2744 -2745  2746  528 -2748 0
 2744 -2745  2746  528  2749 0

c  1-1 --> 0
c    (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0 ∧ -p_528) -> (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧ -b^{1, 529}_0)
c  in CNF:
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_2
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_1
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_0
c  in DIMACS:
 2744  2745 -2746  528 -2747 0
 2744  2745 -2746  528 -2748 0
 2744  2745 -2746  528 -2749 0

c  0-1 --> -1
c    (-b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧ -p_528) -> ( b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0)
c  in CNF:
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨  b^{1, 529}_2
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_1
c     b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨  b^{1, 529}_0
c  in DIMACS:
 2744  2745  2746  528  2747 0
 2744  2745  2746  528 -2748 0
 2744  2745  2746  528  2749 0

c  -1-1 --> -2
c    ( b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧  b^{1, 528}_0 ∧ -p_528) -> ( b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0)
c  in CNF:
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨  b^{1, 529}_2
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨  b^{1, 529}_1
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨  p_528 ∨ -b^{1, 529}_0
c  in DIMACS:
-2744  2745 -2746  528  2747 0
-2744  2745 -2746  528  2748 0
-2744  2745 -2746  528 -2749 0

c  -2-1 --> break 
c    ( b^{1, 528}_2 ∧  b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨  b^{1, 528}_0 ∨  p_528 ∨ break
c  in DIMACS:
-2744 -2745  2746  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 528}_2 ∧ -b^{1, 528}_1 ∧ -b^{1, 528}_0 ∧ true) 
c  in CNF:
c    -b^{1, 528}_2 ∨  b^{1, 528}_1 ∨  b^{1, 528}_0 ∨ false 
c  in DIMACS:
-2744  2745  2746  0

c  3 does not represent an automaton state.
c    -(-b^{1, 528}_2 ∧  b^{1, 528}_1 ∧  b^{1, 528}_0 ∧ true) 
c  in CNF:
c     b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ false 
c  in DIMACS:
 2744 -2745 -2746  0
c  -3 does not represent an automaton state.
c    -( b^{1, 528}_2 ∧  b^{1, 528}_1 ∧  b^{1, 528}_0 ∧ true) 
c  in CNF:
c    -b^{1, 528}_2 ∨ -b^{1, 528}_1 ∨ -b^{1, 528}_0 ∨ false 
c  in DIMACS:
-2744 -2745 -2746  0

c i = 529
c  -2+1 --> -1
c    ( b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧  p_529) -> ( b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0)
c  in CNF:
c    -b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨  b^{1, 530}_2
c    -b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_1
c    -b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨  b^{1, 530}_0
c  in DIMACS:
-2747 -2748  2749 -529  2750 0
-2747 -2748  2749 -529 -2751 0
-2747 -2748  2749 -529  2752 0

c  -1+1 --> 0
c    ( b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0 ∧  p_529) -> (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧ -b^{1, 530}_0)
c  in CNF:
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_2
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_1
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_0
c  in DIMACS:
-2747  2748 -2749 -529 -2750 0
-2747  2748 -2749 -529 -2751 0
-2747  2748 -2749 -529 -2752 0

c  0+1 --> 1
c    (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧  p_529) -> (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0)
c  in CNF:
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_2
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_1
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨  b^{1, 530}_0
c  in DIMACS:
 2747  2748  2749 -529 -2750 0
 2747  2748  2749 -529 -2751 0
 2747  2748  2749 -529  2752 0

c  1+1 --> 2
c    (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0 ∧  p_529) -> (-b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0)
c  in CNF:
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_2
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨  b^{1, 530}_1
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ -p_529 ∨ -b^{1, 530}_0
c  in DIMACS:
 2747  2748 -2749 -529 -2750 0
 2747  2748 -2749 -529  2751 0
 2747  2748 -2749 -529 -2752 0

c  2+1 --> break 
c    (-b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧  p_529) -> break
c  in CNF:
c     b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ -p_529 ∨ break
c  in DIMACS:
 2747 -2748  2749 -529 1162 0


c  2-1 --> 1
c    (-b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧ -p_529) -> (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0)
c  in CNF:
c     b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_2
c     b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_1
c     b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨  b^{1, 530}_0
c  in DIMACS:
 2747 -2748  2749  529 -2750 0
 2747 -2748  2749  529 -2751 0
 2747 -2748  2749  529  2752 0

c  1-1 --> 0
c    (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0 ∧ -p_529) -> (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧ -b^{1, 530}_0)
c  in CNF:
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_2
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_1
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_0
c  in DIMACS:
 2747  2748 -2749  529 -2750 0
 2747  2748 -2749  529 -2751 0
 2747  2748 -2749  529 -2752 0

c  0-1 --> -1
c    (-b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧ -p_529) -> ( b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0)
c  in CNF:
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨  b^{1, 530}_2
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_1
c     b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨  b^{1, 530}_0
c  in DIMACS:
 2747  2748  2749  529  2750 0
 2747  2748  2749  529 -2751 0
 2747  2748  2749  529  2752 0

c  -1-1 --> -2
c    ( b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧  b^{1, 529}_0 ∧ -p_529) -> ( b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0)
c  in CNF:
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨  b^{1, 530}_2
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨  b^{1, 530}_1
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨  p_529 ∨ -b^{1, 530}_0
c  in DIMACS:
-2747  2748 -2749  529  2750 0
-2747  2748 -2749  529  2751 0
-2747  2748 -2749  529 -2752 0

c  -2-1 --> break 
c    ( b^{1, 529}_2 ∧  b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧ -p_529) -> break
c  in CNF:
c    -b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨  b^{1, 529}_0 ∨  p_529 ∨ break
c  in DIMACS:
-2747 -2748  2749  529 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 529}_2 ∧ -b^{1, 529}_1 ∧ -b^{1, 529}_0 ∧ true) 
c  in CNF:
c    -b^{1, 529}_2 ∨  b^{1, 529}_1 ∨  b^{1, 529}_0 ∨ false 
c  in DIMACS:
-2747  2748  2749  0

c  3 does not represent an automaton state.
c    -(-b^{1, 529}_2 ∧  b^{1, 529}_1 ∧  b^{1, 529}_0 ∧ true) 
c  in CNF:
c     b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ false 
c  in DIMACS:
 2747 -2748 -2749  0
c  -3 does not represent an automaton state.
c    -( b^{1, 529}_2 ∧  b^{1, 529}_1 ∧  b^{1, 529}_0 ∧ true) 
c  in CNF:
c    -b^{1, 529}_2 ∨ -b^{1, 529}_1 ∨ -b^{1, 529}_0 ∨ false 
c  in DIMACS:
-2747 -2748 -2749  0

c i = 530
c  -2+1 --> -1
c    ( b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧  p_530) -> ( b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0)
c  in CNF:
c    -b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨  b^{1, 531}_2
c    -b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_1
c    -b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨  b^{1, 531}_0
c  in DIMACS:
-2750 -2751  2752 -530  2753 0
-2750 -2751  2752 -530 -2754 0
-2750 -2751  2752 -530  2755 0

c  -1+1 --> 0
c    ( b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0 ∧  p_530) -> (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧ -b^{1, 531}_0)
c  in CNF:
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_2
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_1
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_0
c  in DIMACS:
-2750  2751 -2752 -530 -2753 0
-2750  2751 -2752 -530 -2754 0
-2750  2751 -2752 -530 -2755 0

c  0+1 --> 1
c    (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧  p_530) -> (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0)
c  in CNF:
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_2
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_1
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨  b^{1, 531}_0
c  in DIMACS:
 2750  2751  2752 -530 -2753 0
 2750  2751  2752 -530 -2754 0
 2750  2751  2752 -530  2755 0

c  1+1 --> 2
c    (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0 ∧  p_530) -> (-b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0)
c  in CNF:
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_2
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨  b^{1, 531}_1
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ -p_530 ∨ -b^{1, 531}_0
c  in DIMACS:
 2750  2751 -2752 -530 -2753 0
 2750  2751 -2752 -530  2754 0
 2750  2751 -2752 -530 -2755 0

c  2+1 --> break 
c    (-b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧  p_530) -> break
c  in CNF:
c     b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 2750 -2751  2752 -530 1162 0


c  2-1 --> 1
c    (-b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧ -p_530) -> (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0)
c  in CNF:
c     b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_2
c     b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_1
c     b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨  b^{1, 531}_0
c  in DIMACS:
 2750 -2751  2752  530 -2753 0
 2750 -2751  2752  530 -2754 0
 2750 -2751  2752  530  2755 0

c  1-1 --> 0
c    (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0 ∧ -p_530) -> (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧ -b^{1, 531}_0)
c  in CNF:
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_2
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_1
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_0
c  in DIMACS:
 2750  2751 -2752  530 -2753 0
 2750  2751 -2752  530 -2754 0
 2750  2751 -2752  530 -2755 0

c  0-1 --> -1
c    (-b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧ -p_530) -> ( b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0)
c  in CNF:
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨  b^{1, 531}_2
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_1
c     b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨  b^{1, 531}_0
c  in DIMACS:
 2750  2751  2752  530  2753 0
 2750  2751  2752  530 -2754 0
 2750  2751  2752  530  2755 0

c  -1-1 --> -2
c    ( b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧  b^{1, 530}_0 ∧ -p_530) -> ( b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0)
c  in CNF:
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨  b^{1, 531}_2
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨  b^{1, 531}_1
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨  p_530 ∨ -b^{1, 531}_0
c  in DIMACS:
-2750  2751 -2752  530  2753 0
-2750  2751 -2752  530  2754 0
-2750  2751 -2752  530 -2755 0

c  -2-1 --> break 
c    ( b^{1, 530}_2 ∧  b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨  b^{1, 530}_0 ∨  p_530 ∨ break
c  in DIMACS:
-2750 -2751  2752  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 530}_2 ∧ -b^{1, 530}_1 ∧ -b^{1, 530}_0 ∧ true) 
c  in CNF:
c    -b^{1, 530}_2 ∨  b^{1, 530}_1 ∨  b^{1, 530}_0 ∨ false 
c  in DIMACS:
-2750  2751  2752  0

c  3 does not represent an automaton state.
c    -(-b^{1, 530}_2 ∧  b^{1, 530}_1 ∧  b^{1, 530}_0 ∧ true) 
c  in CNF:
c     b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ false 
c  in DIMACS:
 2750 -2751 -2752  0
c  -3 does not represent an automaton state.
c    -( b^{1, 530}_2 ∧  b^{1, 530}_1 ∧  b^{1, 530}_0 ∧ true) 
c  in CNF:
c    -b^{1, 530}_2 ∨ -b^{1, 530}_1 ∨ -b^{1, 530}_0 ∨ false 
c  in DIMACS:
-2750 -2751 -2752  0

c i = 531
c  -2+1 --> -1
c    ( b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧  p_531) -> ( b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0)
c  in CNF:
c    -b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨  b^{1, 532}_2
c    -b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_1
c    -b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨  b^{1, 532}_0
c  in DIMACS:
-2753 -2754  2755 -531  2756 0
-2753 -2754  2755 -531 -2757 0
-2753 -2754  2755 -531  2758 0

c  -1+1 --> 0
c    ( b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0 ∧  p_531) -> (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧ -b^{1, 532}_0)
c  in CNF:
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_2
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_1
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_0
c  in DIMACS:
-2753  2754 -2755 -531 -2756 0
-2753  2754 -2755 -531 -2757 0
-2753  2754 -2755 -531 -2758 0

c  0+1 --> 1
c    (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧  p_531) -> (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0)
c  in CNF:
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_2
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_1
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨  b^{1, 532}_0
c  in DIMACS:
 2753  2754  2755 -531 -2756 0
 2753  2754  2755 -531 -2757 0
 2753  2754  2755 -531  2758 0

c  1+1 --> 2
c    (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0 ∧  p_531) -> (-b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0)
c  in CNF:
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_2
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨  b^{1, 532}_1
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ -p_531 ∨ -b^{1, 532}_0
c  in DIMACS:
 2753  2754 -2755 -531 -2756 0
 2753  2754 -2755 -531  2757 0
 2753  2754 -2755 -531 -2758 0

c  2+1 --> break 
c    (-b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧  p_531) -> break
c  in CNF:
c     b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ -p_531 ∨ break
c  in DIMACS:
 2753 -2754  2755 -531 1162 0


c  2-1 --> 1
c    (-b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧ -p_531) -> (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0)
c  in CNF:
c     b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_2
c     b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_1
c     b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨  b^{1, 532}_0
c  in DIMACS:
 2753 -2754  2755  531 -2756 0
 2753 -2754  2755  531 -2757 0
 2753 -2754  2755  531  2758 0

c  1-1 --> 0
c    (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0 ∧ -p_531) -> (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧ -b^{1, 532}_0)
c  in CNF:
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_2
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_1
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_0
c  in DIMACS:
 2753  2754 -2755  531 -2756 0
 2753  2754 -2755  531 -2757 0
 2753  2754 -2755  531 -2758 0

c  0-1 --> -1
c    (-b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧ -p_531) -> ( b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0)
c  in CNF:
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨  b^{1, 532}_2
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_1
c     b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨  b^{1, 532}_0
c  in DIMACS:
 2753  2754  2755  531  2756 0
 2753  2754  2755  531 -2757 0
 2753  2754  2755  531  2758 0

c  -1-1 --> -2
c    ( b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧  b^{1, 531}_0 ∧ -p_531) -> ( b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0)
c  in CNF:
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨  b^{1, 532}_2
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨  b^{1, 532}_1
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨  p_531 ∨ -b^{1, 532}_0
c  in DIMACS:
-2753  2754 -2755  531  2756 0
-2753  2754 -2755  531  2757 0
-2753  2754 -2755  531 -2758 0

c  -2-1 --> break 
c    ( b^{1, 531}_2 ∧  b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧ -p_531) -> break
c  in CNF:
c    -b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨  b^{1, 531}_0 ∨  p_531 ∨ break
c  in DIMACS:
-2753 -2754  2755  531 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 531}_2 ∧ -b^{1, 531}_1 ∧ -b^{1, 531}_0 ∧ true) 
c  in CNF:
c    -b^{1, 531}_2 ∨  b^{1, 531}_1 ∨  b^{1, 531}_0 ∨ false 
c  in DIMACS:
-2753  2754  2755  0

c  3 does not represent an automaton state.
c    -(-b^{1, 531}_2 ∧  b^{1, 531}_1 ∧  b^{1, 531}_0 ∧ true) 
c  in CNF:
c     b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ false 
c  in DIMACS:
 2753 -2754 -2755  0
c  -3 does not represent an automaton state.
c    -( b^{1, 531}_2 ∧  b^{1, 531}_1 ∧  b^{1, 531}_0 ∧ true) 
c  in CNF:
c    -b^{1, 531}_2 ∨ -b^{1, 531}_1 ∨ -b^{1, 531}_0 ∨ false 
c  in DIMACS:
-2753 -2754 -2755  0

c i = 532
c  -2+1 --> -1
c    ( b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧  p_532) -> ( b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0)
c  in CNF:
c    -b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨  b^{1, 533}_2
c    -b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_1
c    -b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨  b^{1, 533}_0
c  in DIMACS:
-2756 -2757  2758 -532  2759 0
-2756 -2757  2758 -532 -2760 0
-2756 -2757  2758 -532  2761 0

c  -1+1 --> 0
c    ( b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0 ∧  p_532) -> (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧ -b^{1, 533}_0)
c  in CNF:
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_2
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_1
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_0
c  in DIMACS:
-2756  2757 -2758 -532 -2759 0
-2756  2757 -2758 -532 -2760 0
-2756  2757 -2758 -532 -2761 0

c  0+1 --> 1
c    (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧  p_532) -> (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0)
c  in CNF:
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_2
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_1
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨  b^{1, 533}_0
c  in DIMACS:
 2756  2757  2758 -532 -2759 0
 2756  2757  2758 -532 -2760 0
 2756  2757  2758 -532  2761 0

c  1+1 --> 2
c    (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0 ∧  p_532) -> (-b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0)
c  in CNF:
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_2
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨  b^{1, 533}_1
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ -p_532 ∨ -b^{1, 533}_0
c  in DIMACS:
 2756  2757 -2758 -532 -2759 0
 2756  2757 -2758 -532  2760 0
 2756  2757 -2758 -532 -2761 0

c  2+1 --> break 
c    (-b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧  p_532) -> break
c  in CNF:
c     b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 2756 -2757  2758 -532 1162 0


c  2-1 --> 1
c    (-b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧ -p_532) -> (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0)
c  in CNF:
c     b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_2
c     b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_1
c     b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨  b^{1, 533}_0
c  in DIMACS:
 2756 -2757  2758  532 -2759 0
 2756 -2757  2758  532 -2760 0
 2756 -2757  2758  532  2761 0

c  1-1 --> 0
c    (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0 ∧ -p_532) -> (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧ -b^{1, 533}_0)
c  in CNF:
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_2
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_1
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_0
c  in DIMACS:
 2756  2757 -2758  532 -2759 0
 2756  2757 -2758  532 -2760 0
 2756  2757 -2758  532 -2761 0

c  0-1 --> -1
c    (-b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧ -p_532) -> ( b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0)
c  in CNF:
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨  b^{1, 533}_2
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_1
c     b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨  b^{1, 533}_0
c  in DIMACS:
 2756  2757  2758  532  2759 0
 2756  2757  2758  532 -2760 0
 2756  2757  2758  532  2761 0

c  -1-1 --> -2
c    ( b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧  b^{1, 532}_0 ∧ -p_532) -> ( b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0)
c  in CNF:
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨  b^{1, 533}_2
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨  b^{1, 533}_1
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨  p_532 ∨ -b^{1, 533}_0
c  in DIMACS:
-2756  2757 -2758  532  2759 0
-2756  2757 -2758  532  2760 0
-2756  2757 -2758  532 -2761 0

c  -2-1 --> break 
c    ( b^{1, 532}_2 ∧  b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨  b^{1, 532}_0 ∨  p_532 ∨ break
c  in DIMACS:
-2756 -2757  2758  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 532}_2 ∧ -b^{1, 532}_1 ∧ -b^{1, 532}_0 ∧ true) 
c  in CNF:
c    -b^{1, 532}_2 ∨  b^{1, 532}_1 ∨  b^{1, 532}_0 ∨ false 
c  in DIMACS:
-2756  2757  2758  0

c  3 does not represent an automaton state.
c    -(-b^{1, 532}_2 ∧  b^{1, 532}_1 ∧  b^{1, 532}_0 ∧ true) 
c  in CNF:
c     b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ false 
c  in DIMACS:
 2756 -2757 -2758  0
c  -3 does not represent an automaton state.
c    -( b^{1, 532}_2 ∧  b^{1, 532}_1 ∧  b^{1, 532}_0 ∧ true) 
c  in CNF:
c    -b^{1, 532}_2 ∨ -b^{1, 532}_1 ∨ -b^{1, 532}_0 ∨ false 
c  in DIMACS:
-2756 -2757 -2758  0

c i = 533
c  -2+1 --> -1
c    ( b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧  p_533) -> ( b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0)
c  in CNF:
c    -b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨  b^{1, 534}_2
c    -b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_1
c    -b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨  b^{1, 534}_0
c  in DIMACS:
-2759 -2760  2761 -533  2762 0
-2759 -2760  2761 -533 -2763 0
-2759 -2760  2761 -533  2764 0

c  -1+1 --> 0
c    ( b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0 ∧  p_533) -> (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧ -b^{1, 534}_0)
c  in CNF:
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_2
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_1
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_0
c  in DIMACS:
-2759  2760 -2761 -533 -2762 0
-2759  2760 -2761 -533 -2763 0
-2759  2760 -2761 -533 -2764 0

c  0+1 --> 1
c    (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧  p_533) -> (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0)
c  in CNF:
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_2
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_1
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨  b^{1, 534}_0
c  in DIMACS:
 2759  2760  2761 -533 -2762 0
 2759  2760  2761 -533 -2763 0
 2759  2760  2761 -533  2764 0

c  1+1 --> 2
c    (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0 ∧  p_533) -> (-b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0)
c  in CNF:
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_2
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨  b^{1, 534}_1
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ -p_533 ∨ -b^{1, 534}_0
c  in DIMACS:
 2759  2760 -2761 -533 -2762 0
 2759  2760 -2761 -533  2763 0
 2759  2760 -2761 -533 -2764 0

c  2+1 --> break 
c    (-b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧  p_533) -> break
c  in CNF:
c     b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ -p_533 ∨ break
c  in DIMACS:
 2759 -2760  2761 -533 1162 0


c  2-1 --> 1
c    (-b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧ -p_533) -> (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0)
c  in CNF:
c     b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_2
c     b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_1
c     b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨  b^{1, 534}_0
c  in DIMACS:
 2759 -2760  2761  533 -2762 0
 2759 -2760  2761  533 -2763 0
 2759 -2760  2761  533  2764 0

c  1-1 --> 0
c    (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0 ∧ -p_533) -> (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧ -b^{1, 534}_0)
c  in CNF:
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_2
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_1
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_0
c  in DIMACS:
 2759  2760 -2761  533 -2762 0
 2759  2760 -2761  533 -2763 0
 2759  2760 -2761  533 -2764 0

c  0-1 --> -1
c    (-b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧ -p_533) -> ( b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0)
c  in CNF:
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨  b^{1, 534}_2
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_1
c     b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨  b^{1, 534}_0
c  in DIMACS:
 2759  2760  2761  533  2762 0
 2759  2760  2761  533 -2763 0
 2759  2760  2761  533  2764 0

c  -1-1 --> -2
c    ( b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧  b^{1, 533}_0 ∧ -p_533) -> ( b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0)
c  in CNF:
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨  b^{1, 534}_2
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨  b^{1, 534}_1
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨  p_533 ∨ -b^{1, 534}_0
c  in DIMACS:
-2759  2760 -2761  533  2762 0
-2759  2760 -2761  533  2763 0
-2759  2760 -2761  533 -2764 0

c  -2-1 --> break 
c    ( b^{1, 533}_2 ∧  b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧ -p_533) -> break
c  in CNF:
c    -b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨  b^{1, 533}_0 ∨  p_533 ∨ break
c  in DIMACS:
-2759 -2760  2761  533 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 533}_2 ∧ -b^{1, 533}_1 ∧ -b^{1, 533}_0 ∧ true) 
c  in CNF:
c    -b^{1, 533}_2 ∨  b^{1, 533}_1 ∨  b^{1, 533}_0 ∨ false 
c  in DIMACS:
-2759  2760  2761  0

c  3 does not represent an automaton state.
c    -(-b^{1, 533}_2 ∧  b^{1, 533}_1 ∧  b^{1, 533}_0 ∧ true) 
c  in CNF:
c     b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ false 
c  in DIMACS:
 2759 -2760 -2761  0
c  -3 does not represent an automaton state.
c    -( b^{1, 533}_2 ∧  b^{1, 533}_1 ∧  b^{1, 533}_0 ∧ true) 
c  in CNF:
c    -b^{1, 533}_2 ∨ -b^{1, 533}_1 ∨ -b^{1, 533}_0 ∨ false 
c  in DIMACS:
-2759 -2760 -2761  0

c i = 534
c  -2+1 --> -1
c    ( b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧  p_534) -> ( b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0)
c  in CNF:
c    -b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨  b^{1, 535}_2
c    -b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_1
c    -b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨  b^{1, 535}_0
c  in DIMACS:
-2762 -2763  2764 -534  2765 0
-2762 -2763  2764 -534 -2766 0
-2762 -2763  2764 -534  2767 0

c  -1+1 --> 0
c    ( b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0 ∧  p_534) -> (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧ -b^{1, 535}_0)
c  in CNF:
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_2
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_1
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_0
c  in DIMACS:
-2762  2763 -2764 -534 -2765 0
-2762  2763 -2764 -534 -2766 0
-2762  2763 -2764 -534 -2767 0

c  0+1 --> 1
c    (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧  p_534) -> (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0)
c  in CNF:
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_2
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_1
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨  b^{1, 535}_0
c  in DIMACS:
 2762  2763  2764 -534 -2765 0
 2762  2763  2764 -534 -2766 0
 2762  2763  2764 -534  2767 0

c  1+1 --> 2
c    (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0 ∧  p_534) -> (-b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0)
c  in CNF:
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_2
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨  b^{1, 535}_1
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ -p_534 ∨ -b^{1, 535}_0
c  in DIMACS:
 2762  2763 -2764 -534 -2765 0
 2762  2763 -2764 -534  2766 0
 2762  2763 -2764 -534 -2767 0

c  2+1 --> break 
c    (-b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧  p_534) -> break
c  in CNF:
c     b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 2762 -2763  2764 -534 1162 0


c  2-1 --> 1
c    (-b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧ -p_534) -> (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0)
c  in CNF:
c     b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_2
c     b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_1
c     b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨  b^{1, 535}_0
c  in DIMACS:
 2762 -2763  2764  534 -2765 0
 2762 -2763  2764  534 -2766 0
 2762 -2763  2764  534  2767 0

c  1-1 --> 0
c    (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0 ∧ -p_534) -> (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧ -b^{1, 535}_0)
c  in CNF:
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_2
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_1
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_0
c  in DIMACS:
 2762  2763 -2764  534 -2765 0
 2762  2763 -2764  534 -2766 0
 2762  2763 -2764  534 -2767 0

c  0-1 --> -1
c    (-b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧ -p_534) -> ( b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0)
c  in CNF:
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨  b^{1, 535}_2
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_1
c     b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨  b^{1, 535}_0
c  in DIMACS:
 2762  2763  2764  534  2765 0
 2762  2763  2764  534 -2766 0
 2762  2763  2764  534  2767 0

c  -1-1 --> -2
c    ( b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧  b^{1, 534}_0 ∧ -p_534) -> ( b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0)
c  in CNF:
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨  b^{1, 535}_2
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨  b^{1, 535}_1
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨  p_534 ∨ -b^{1, 535}_0
c  in DIMACS:
-2762  2763 -2764  534  2765 0
-2762  2763 -2764  534  2766 0
-2762  2763 -2764  534 -2767 0

c  -2-1 --> break 
c    ( b^{1, 534}_2 ∧  b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨  b^{1, 534}_0 ∨  p_534 ∨ break
c  in DIMACS:
-2762 -2763  2764  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 534}_2 ∧ -b^{1, 534}_1 ∧ -b^{1, 534}_0 ∧ true) 
c  in CNF:
c    -b^{1, 534}_2 ∨  b^{1, 534}_1 ∨  b^{1, 534}_0 ∨ false 
c  in DIMACS:
-2762  2763  2764  0

c  3 does not represent an automaton state.
c    -(-b^{1, 534}_2 ∧  b^{1, 534}_1 ∧  b^{1, 534}_0 ∧ true) 
c  in CNF:
c     b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ false 
c  in DIMACS:
 2762 -2763 -2764  0
c  -3 does not represent an automaton state.
c    -( b^{1, 534}_2 ∧  b^{1, 534}_1 ∧  b^{1, 534}_0 ∧ true) 
c  in CNF:
c    -b^{1, 534}_2 ∨ -b^{1, 534}_1 ∨ -b^{1, 534}_0 ∨ false 
c  in DIMACS:
-2762 -2763 -2764  0

c i = 535
c  -2+1 --> -1
c    ( b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧  p_535) -> ( b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0)
c  in CNF:
c    -b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨  b^{1, 536}_2
c    -b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_1
c    -b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨  b^{1, 536}_0
c  in DIMACS:
-2765 -2766  2767 -535  2768 0
-2765 -2766  2767 -535 -2769 0
-2765 -2766  2767 -535  2770 0

c  -1+1 --> 0
c    ( b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0 ∧  p_535) -> (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧ -b^{1, 536}_0)
c  in CNF:
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_2
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_1
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_0
c  in DIMACS:
-2765  2766 -2767 -535 -2768 0
-2765  2766 -2767 -535 -2769 0
-2765  2766 -2767 -535 -2770 0

c  0+1 --> 1
c    (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧  p_535) -> (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0)
c  in CNF:
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_2
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_1
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨  b^{1, 536}_0
c  in DIMACS:
 2765  2766  2767 -535 -2768 0
 2765  2766  2767 -535 -2769 0
 2765  2766  2767 -535  2770 0

c  1+1 --> 2
c    (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0 ∧  p_535) -> (-b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0)
c  in CNF:
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_2
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨  b^{1, 536}_1
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ -p_535 ∨ -b^{1, 536}_0
c  in DIMACS:
 2765  2766 -2767 -535 -2768 0
 2765  2766 -2767 -535  2769 0
 2765  2766 -2767 -535 -2770 0

c  2+1 --> break 
c    (-b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧  p_535) -> break
c  in CNF:
c     b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ -p_535 ∨ break
c  in DIMACS:
 2765 -2766  2767 -535 1162 0


c  2-1 --> 1
c    (-b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧ -p_535) -> (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0)
c  in CNF:
c     b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_2
c     b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_1
c     b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨  b^{1, 536}_0
c  in DIMACS:
 2765 -2766  2767  535 -2768 0
 2765 -2766  2767  535 -2769 0
 2765 -2766  2767  535  2770 0

c  1-1 --> 0
c    (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0 ∧ -p_535) -> (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧ -b^{1, 536}_0)
c  in CNF:
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_2
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_1
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_0
c  in DIMACS:
 2765  2766 -2767  535 -2768 0
 2765  2766 -2767  535 -2769 0
 2765  2766 -2767  535 -2770 0

c  0-1 --> -1
c    (-b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧ -p_535) -> ( b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0)
c  in CNF:
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨  b^{1, 536}_2
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_1
c     b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨  b^{1, 536}_0
c  in DIMACS:
 2765  2766  2767  535  2768 0
 2765  2766  2767  535 -2769 0
 2765  2766  2767  535  2770 0

c  -1-1 --> -2
c    ( b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧  b^{1, 535}_0 ∧ -p_535) -> ( b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0)
c  in CNF:
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨  b^{1, 536}_2
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨  b^{1, 536}_1
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨  p_535 ∨ -b^{1, 536}_0
c  in DIMACS:
-2765  2766 -2767  535  2768 0
-2765  2766 -2767  535  2769 0
-2765  2766 -2767  535 -2770 0

c  -2-1 --> break 
c    ( b^{1, 535}_2 ∧  b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧ -p_535) -> break
c  in CNF:
c    -b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨  b^{1, 535}_0 ∨  p_535 ∨ break
c  in DIMACS:
-2765 -2766  2767  535 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 535}_2 ∧ -b^{1, 535}_1 ∧ -b^{1, 535}_0 ∧ true) 
c  in CNF:
c    -b^{1, 535}_2 ∨  b^{1, 535}_1 ∨  b^{1, 535}_0 ∨ false 
c  in DIMACS:
-2765  2766  2767  0

c  3 does not represent an automaton state.
c    -(-b^{1, 535}_2 ∧  b^{1, 535}_1 ∧  b^{1, 535}_0 ∧ true) 
c  in CNF:
c     b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ false 
c  in DIMACS:
 2765 -2766 -2767  0
c  -3 does not represent an automaton state.
c    -( b^{1, 535}_2 ∧  b^{1, 535}_1 ∧  b^{1, 535}_0 ∧ true) 
c  in CNF:
c    -b^{1, 535}_2 ∨ -b^{1, 535}_1 ∨ -b^{1, 535}_0 ∨ false 
c  in DIMACS:
-2765 -2766 -2767  0

c i = 536
c  -2+1 --> -1
c    ( b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧  p_536) -> ( b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0)
c  in CNF:
c    -b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨  b^{1, 537}_2
c    -b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_1
c    -b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨  b^{1, 537}_0
c  in DIMACS:
-2768 -2769  2770 -536  2771 0
-2768 -2769  2770 -536 -2772 0
-2768 -2769  2770 -536  2773 0

c  -1+1 --> 0
c    ( b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0 ∧  p_536) -> (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧ -b^{1, 537}_0)
c  in CNF:
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_2
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_1
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_0
c  in DIMACS:
-2768  2769 -2770 -536 -2771 0
-2768  2769 -2770 -536 -2772 0
-2768  2769 -2770 -536 -2773 0

c  0+1 --> 1
c    (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧  p_536) -> (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0)
c  in CNF:
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_2
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_1
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨  b^{1, 537}_0
c  in DIMACS:
 2768  2769  2770 -536 -2771 0
 2768  2769  2770 -536 -2772 0
 2768  2769  2770 -536  2773 0

c  1+1 --> 2
c    (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0 ∧  p_536) -> (-b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0)
c  in CNF:
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_2
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨  b^{1, 537}_1
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ -p_536 ∨ -b^{1, 537}_0
c  in DIMACS:
 2768  2769 -2770 -536 -2771 0
 2768  2769 -2770 -536  2772 0
 2768  2769 -2770 -536 -2773 0

c  2+1 --> break 
c    (-b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧  p_536) -> break
c  in CNF:
c     b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 2768 -2769  2770 -536 1162 0


c  2-1 --> 1
c    (-b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧ -p_536) -> (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0)
c  in CNF:
c     b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_2
c     b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_1
c     b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨  b^{1, 537}_0
c  in DIMACS:
 2768 -2769  2770  536 -2771 0
 2768 -2769  2770  536 -2772 0
 2768 -2769  2770  536  2773 0

c  1-1 --> 0
c    (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0 ∧ -p_536) -> (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧ -b^{1, 537}_0)
c  in CNF:
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_2
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_1
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_0
c  in DIMACS:
 2768  2769 -2770  536 -2771 0
 2768  2769 -2770  536 -2772 0
 2768  2769 -2770  536 -2773 0

c  0-1 --> -1
c    (-b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧ -p_536) -> ( b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0)
c  in CNF:
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨  b^{1, 537}_2
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_1
c     b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨  b^{1, 537}_0
c  in DIMACS:
 2768  2769  2770  536  2771 0
 2768  2769  2770  536 -2772 0
 2768  2769  2770  536  2773 0

c  -1-1 --> -2
c    ( b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧  b^{1, 536}_0 ∧ -p_536) -> ( b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0)
c  in CNF:
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨  b^{1, 537}_2
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨  b^{1, 537}_1
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨  p_536 ∨ -b^{1, 537}_0
c  in DIMACS:
-2768  2769 -2770  536  2771 0
-2768  2769 -2770  536  2772 0
-2768  2769 -2770  536 -2773 0

c  -2-1 --> break 
c    ( b^{1, 536}_2 ∧  b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨  b^{1, 536}_0 ∨  p_536 ∨ break
c  in DIMACS:
-2768 -2769  2770  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 536}_2 ∧ -b^{1, 536}_1 ∧ -b^{1, 536}_0 ∧ true) 
c  in CNF:
c    -b^{1, 536}_2 ∨  b^{1, 536}_1 ∨  b^{1, 536}_0 ∨ false 
c  in DIMACS:
-2768  2769  2770  0

c  3 does not represent an automaton state.
c    -(-b^{1, 536}_2 ∧  b^{1, 536}_1 ∧  b^{1, 536}_0 ∧ true) 
c  in CNF:
c     b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ false 
c  in DIMACS:
 2768 -2769 -2770  0
c  -3 does not represent an automaton state.
c    -( b^{1, 536}_2 ∧  b^{1, 536}_1 ∧  b^{1, 536}_0 ∧ true) 
c  in CNF:
c    -b^{1, 536}_2 ∨ -b^{1, 536}_1 ∨ -b^{1, 536}_0 ∨ false 
c  in DIMACS:
-2768 -2769 -2770  0

c i = 537
c  -2+1 --> -1
c    ( b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧  p_537) -> ( b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0)
c  in CNF:
c    -b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨  b^{1, 538}_2
c    -b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_1
c    -b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨  b^{1, 538}_0
c  in DIMACS:
-2771 -2772  2773 -537  2774 0
-2771 -2772  2773 -537 -2775 0
-2771 -2772  2773 -537  2776 0

c  -1+1 --> 0
c    ( b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0 ∧  p_537) -> (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧ -b^{1, 538}_0)
c  in CNF:
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_2
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_1
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_0
c  in DIMACS:
-2771  2772 -2773 -537 -2774 0
-2771  2772 -2773 -537 -2775 0
-2771  2772 -2773 -537 -2776 0

c  0+1 --> 1
c    (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧  p_537) -> (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0)
c  in CNF:
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_2
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_1
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨  b^{1, 538}_0
c  in DIMACS:
 2771  2772  2773 -537 -2774 0
 2771  2772  2773 -537 -2775 0
 2771  2772  2773 -537  2776 0

c  1+1 --> 2
c    (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0 ∧  p_537) -> (-b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0)
c  in CNF:
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_2
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨  b^{1, 538}_1
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ -p_537 ∨ -b^{1, 538}_0
c  in DIMACS:
 2771  2772 -2773 -537 -2774 0
 2771  2772 -2773 -537  2775 0
 2771  2772 -2773 -537 -2776 0

c  2+1 --> break 
c    (-b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧  p_537) -> break
c  in CNF:
c     b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ -p_537 ∨ break
c  in DIMACS:
 2771 -2772  2773 -537 1162 0


c  2-1 --> 1
c    (-b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧ -p_537) -> (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0)
c  in CNF:
c     b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_2
c     b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_1
c     b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨  b^{1, 538}_0
c  in DIMACS:
 2771 -2772  2773  537 -2774 0
 2771 -2772  2773  537 -2775 0
 2771 -2772  2773  537  2776 0

c  1-1 --> 0
c    (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0 ∧ -p_537) -> (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧ -b^{1, 538}_0)
c  in CNF:
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_2
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_1
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_0
c  in DIMACS:
 2771  2772 -2773  537 -2774 0
 2771  2772 -2773  537 -2775 0
 2771  2772 -2773  537 -2776 0

c  0-1 --> -1
c    (-b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧ -p_537) -> ( b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0)
c  in CNF:
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨  b^{1, 538}_2
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_1
c     b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨  b^{1, 538}_0
c  in DIMACS:
 2771  2772  2773  537  2774 0
 2771  2772  2773  537 -2775 0
 2771  2772  2773  537  2776 0

c  -1-1 --> -2
c    ( b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧  b^{1, 537}_0 ∧ -p_537) -> ( b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0)
c  in CNF:
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨  b^{1, 538}_2
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨  b^{1, 538}_1
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨  p_537 ∨ -b^{1, 538}_0
c  in DIMACS:
-2771  2772 -2773  537  2774 0
-2771  2772 -2773  537  2775 0
-2771  2772 -2773  537 -2776 0

c  -2-1 --> break 
c    ( b^{1, 537}_2 ∧  b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧ -p_537) -> break
c  in CNF:
c    -b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨  b^{1, 537}_0 ∨  p_537 ∨ break
c  in DIMACS:
-2771 -2772  2773  537 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 537}_2 ∧ -b^{1, 537}_1 ∧ -b^{1, 537}_0 ∧ true) 
c  in CNF:
c    -b^{1, 537}_2 ∨  b^{1, 537}_1 ∨  b^{1, 537}_0 ∨ false 
c  in DIMACS:
-2771  2772  2773  0

c  3 does not represent an automaton state.
c    -(-b^{1, 537}_2 ∧  b^{1, 537}_1 ∧  b^{1, 537}_0 ∧ true) 
c  in CNF:
c     b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ false 
c  in DIMACS:
 2771 -2772 -2773  0
c  -3 does not represent an automaton state.
c    -( b^{1, 537}_2 ∧  b^{1, 537}_1 ∧  b^{1, 537}_0 ∧ true) 
c  in CNF:
c    -b^{1, 537}_2 ∨ -b^{1, 537}_1 ∨ -b^{1, 537}_0 ∨ false 
c  in DIMACS:
-2771 -2772 -2773  0

c i = 538
c  -2+1 --> -1
c    ( b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧  p_538) -> ( b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0)
c  in CNF:
c    -b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨  b^{1, 539}_2
c    -b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_1
c    -b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨  b^{1, 539}_0
c  in DIMACS:
-2774 -2775  2776 -538  2777 0
-2774 -2775  2776 -538 -2778 0
-2774 -2775  2776 -538  2779 0

c  -1+1 --> 0
c    ( b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0 ∧  p_538) -> (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧ -b^{1, 539}_0)
c  in CNF:
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_2
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_1
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_0
c  in DIMACS:
-2774  2775 -2776 -538 -2777 0
-2774  2775 -2776 -538 -2778 0
-2774  2775 -2776 -538 -2779 0

c  0+1 --> 1
c    (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧  p_538) -> (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0)
c  in CNF:
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_2
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_1
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨  b^{1, 539}_0
c  in DIMACS:
 2774  2775  2776 -538 -2777 0
 2774  2775  2776 -538 -2778 0
 2774  2775  2776 -538  2779 0

c  1+1 --> 2
c    (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0 ∧  p_538) -> (-b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0)
c  in CNF:
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_2
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨  b^{1, 539}_1
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ -p_538 ∨ -b^{1, 539}_0
c  in DIMACS:
 2774  2775 -2776 -538 -2777 0
 2774  2775 -2776 -538  2778 0
 2774  2775 -2776 -538 -2779 0

c  2+1 --> break 
c    (-b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧  p_538) -> break
c  in CNF:
c     b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ -p_538 ∨ break
c  in DIMACS:
 2774 -2775  2776 -538 1162 0


c  2-1 --> 1
c    (-b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧ -p_538) -> (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0)
c  in CNF:
c     b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_2
c     b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_1
c     b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨  b^{1, 539}_0
c  in DIMACS:
 2774 -2775  2776  538 -2777 0
 2774 -2775  2776  538 -2778 0
 2774 -2775  2776  538  2779 0

c  1-1 --> 0
c    (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0 ∧ -p_538) -> (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧ -b^{1, 539}_0)
c  in CNF:
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_2
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_1
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_0
c  in DIMACS:
 2774  2775 -2776  538 -2777 0
 2774  2775 -2776  538 -2778 0
 2774  2775 -2776  538 -2779 0

c  0-1 --> -1
c    (-b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧ -p_538) -> ( b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0)
c  in CNF:
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨  b^{1, 539}_2
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_1
c     b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨  b^{1, 539}_0
c  in DIMACS:
 2774  2775  2776  538  2777 0
 2774  2775  2776  538 -2778 0
 2774  2775  2776  538  2779 0

c  -1-1 --> -2
c    ( b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧  b^{1, 538}_0 ∧ -p_538) -> ( b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0)
c  in CNF:
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨  b^{1, 539}_2
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨  b^{1, 539}_1
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨  p_538 ∨ -b^{1, 539}_0
c  in DIMACS:
-2774  2775 -2776  538  2777 0
-2774  2775 -2776  538  2778 0
-2774  2775 -2776  538 -2779 0

c  -2-1 --> break 
c    ( b^{1, 538}_2 ∧  b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧ -p_538) -> break
c  in CNF:
c    -b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨  b^{1, 538}_0 ∨  p_538 ∨ break
c  in DIMACS:
-2774 -2775  2776  538 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 538}_2 ∧ -b^{1, 538}_1 ∧ -b^{1, 538}_0 ∧ true) 
c  in CNF:
c    -b^{1, 538}_2 ∨  b^{1, 538}_1 ∨  b^{1, 538}_0 ∨ false 
c  in DIMACS:
-2774  2775  2776  0

c  3 does not represent an automaton state.
c    -(-b^{1, 538}_2 ∧  b^{1, 538}_1 ∧  b^{1, 538}_0 ∧ true) 
c  in CNF:
c     b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ false 
c  in DIMACS:
 2774 -2775 -2776  0
c  -3 does not represent an automaton state.
c    -( b^{1, 538}_2 ∧  b^{1, 538}_1 ∧  b^{1, 538}_0 ∧ true) 
c  in CNF:
c    -b^{1, 538}_2 ∨ -b^{1, 538}_1 ∨ -b^{1, 538}_0 ∨ false 
c  in DIMACS:
-2774 -2775 -2776  0

c i = 539
c  -2+1 --> -1
c    ( b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧  p_539) -> ( b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0)
c  in CNF:
c    -b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨  b^{1, 540}_2
c    -b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_1
c    -b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨  b^{1, 540}_0
c  in DIMACS:
-2777 -2778  2779 -539  2780 0
-2777 -2778  2779 -539 -2781 0
-2777 -2778  2779 -539  2782 0

c  -1+1 --> 0
c    ( b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0 ∧  p_539) -> (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧ -b^{1, 540}_0)
c  in CNF:
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_2
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_1
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_0
c  in DIMACS:
-2777  2778 -2779 -539 -2780 0
-2777  2778 -2779 -539 -2781 0
-2777  2778 -2779 -539 -2782 0

c  0+1 --> 1
c    (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧  p_539) -> (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0)
c  in CNF:
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_2
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_1
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨  b^{1, 540}_0
c  in DIMACS:
 2777  2778  2779 -539 -2780 0
 2777  2778  2779 -539 -2781 0
 2777  2778  2779 -539  2782 0

c  1+1 --> 2
c    (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0 ∧  p_539) -> (-b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0)
c  in CNF:
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_2
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨  b^{1, 540}_1
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ -p_539 ∨ -b^{1, 540}_0
c  in DIMACS:
 2777  2778 -2779 -539 -2780 0
 2777  2778 -2779 -539  2781 0
 2777  2778 -2779 -539 -2782 0

c  2+1 --> break 
c    (-b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧  p_539) -> break
c  in CNF:
c     b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ -p_539 ∨ break
c  in DIMACS:
 2777 -2778  2779 -539 1162 0


c  2-1 --> 1
c    (-b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧ -p_539) -> (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0)
c  in CNF:
c     b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_2
c     b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_1
c     b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨  b^{1, 540}_0
c  in DIMACS:
 2777 -2778  2779  539 -2780 0
 2777 -2778  2779  539 -2781 0
 2777 -2778  2779  539  2782 0

c  1-1 --> 0
c    (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0 ∧ -p_539) -> (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧ -b^{1, 540}_0)
c  in CNF:
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_2
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_1
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_0
c  in DIMACS:
 2777  2778 -2779  539 -2780 0
 2777  2778 -2779  539 -2781 0
 2777  2778 -2779  539 -2782 0

c  0-1 --> -1
c    (-b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧ -p_539) -> ( b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0)
c  in CNF:
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨  b^{1, 540}_2
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_1
c     b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨  b^{1, 540}_0
c  in DIMACS:
 2777  2778  2779  539  2780 0
 2777  2778  2779  539 -2781 0
 2777  2778  2779  539  2782 0

c  -1-1 --> -2
c    ( b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧  b^{1, 539}_0 ∧ -p_539) -> ( b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0)
c  in CNF:
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨  b^{1, 540}_2
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨  b^{1, 540}_1
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨  p_539 ∨ -b^{1, 540}_0
c  in DIMACS:
-2777  2778 -2779  539  2780 0
-2777  2778 -2779  539  2781 0
-2777  2778 -2779  539 -2782 0

c  -2-1 --> break 
c    ( b^{1, 539}_2 ∧  b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧ -p_539) -> break
c  in CNF:
c    -b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨  b^{1, 539}_0 ∨  p_539 ∨ break
c  in DIMACS:
-2777 -2778  2779  539 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 539}_2 ∧ -b^{1, 539}_1 ∧ -b^{1, 539}_0 ∧ true) 
c  in CNF:
c    -b^{1, 539}_2 ∨  b^{1, 539}_1 ∨  b^{1, 539}_0 ∨ false 
c  in DIMACS:
-2777  2778  2779  0

c  3 does not represent an automaton state.
c    -(-b^{1, 539}_2 ∧  b^{1, 539}_1 ∧  b^{1, 539}_0 ∧ true) 
c  in CNF:
c     b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ false 
c  in DIMACS:
 2777 -2778 -2779  0
c  -3 does not represent an automaton state.
c    -( b^{1, 539}_2 ∧  b^{1, 539}_1 ∧  b^{1, 539}_0 ∧ true) 
c  in CNF:
c    -b^{1, 539}_2 ∨ -b^{1, 539}_1 ∨ -b^{1, 539}_0 ∨ false 
c  in DIMACS:
-2777 -2778 -2779  0

c i = 540
c  -2+1 --> -1
c    ( b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧  p_540) -> ( b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0)
c  in CNF:
c    -b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨  b^{1, 541}_2
c    -b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_1
c    -b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨  b^{1, 541}_0
c  in DIMACS:
-2780 -2781  2782 -540  2783 0
-2780 -2781  2782 -540 -2784 0
-2780 -2781  2782 -540  2785 0

c  -1+1 --> 0
c    ( b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0 ∧  p_540) -> (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧ -b^{1, 541}_0)
c  in CNF:
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_2
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_1
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_0
c  in DIMACS:
-2780  2781 -2782 -540 -2783 0
-2780  2781 -2782 -540 -2784 0
-2780  2781 -2782 -540 -2785 0

c  0+1 --> 1
c    (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧  p_540) -> (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0)
c  in CNF:
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_2
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_1
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨  b^{1, 541}_0
c  in DIMACS:
 2780  2781  2782 -540 -2783 0
 2780  2781  2782 -540 -2784 0
 2780  2781  2782 -540  2785 0

c  1+1 --> 2
c    (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0 ∧  p_540) -> (-b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0)
c  in CNF:
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_2
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨  b^{1, 541}_1
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ -p_540 ∨ -b^{1, 541}_0
c  in DIMACS:
 2780  2781 -2782 -540 -2783 0
 2780  2781 -2782 -540  2784 0
 2780  2781 -2782 -540 -2785 0

c  2+1 --> break 
c    (-b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧  p_540) -> break
c  in CNF:
c     b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 2780 -2781  2782 -540 1162 0


c  2-1 --> 1
c    (-b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧ -p_540) -> (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0)
c  in CNF:
c     b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_2
c     b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_1
c     b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨  b^{1, 541}_0
c  in DIMACS:
 2780 -2781  2782  540 -2783 0
 2780 -2781  2782  540 -2784 0
 2780 -2781  2782  540  2785 0

c  1-1 --> 0
c    (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0 ∧ -p_540) -> (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧ -b^{1, 541}_0)
c  in CNF:
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_2
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_1
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_0
c  in DIMACS:
 2780  2781 -2782  540 -2783 0
 2780  2781 -2782  540 -2784 0
 2780  2781 -2782  540 -2785 0

c  0-1 --> -1
c    (-b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧ -p_540) -> ( b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0)
c  in CNF:
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨  b^{1, 541}_2
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_1
c     b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨  b^{1, 541}_0
c  in DIMACS:
 2780  2781  2782  540  2783 0
 2780  2781  2782  540 -2784 0
 2780  2781  2782  540  2785 0

c  -1-1 --> -2
c    ( b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧  b^{1, 540}_0 ∧ -p_540) -> ( b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0)
c  in CNF:
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨  b^{1, 541}_2
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨  b^{1, 541}_1
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨  p_540 ∨ -b^{1, 541}_0
c  in DIMACS:
-2780  2781 -2782  540  2783 0
-2780  2781 -2782  540  2784 0
-2780  2781 -2782  540 -2785 0

c  -2-1 --> break 
c    ( b^{1, 540}_2 ∧  b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨  b^{1, 540}_0 ∨  p_540 ∨ break
c  in DIMACS:
-2780 -2781  2782  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 540}_2 ∧ -b^{1, 540}_1 ∧ -b^{1, 540}_0 ∧ true) 
c  in CNF:
c    -b^{1, 540}_2 ∨  b^{1, 540}_1 ∨  b^{1, 540}_0 ∨ false 
c  in DIMACS:
-2780  2781  2782  0

c  3 does not represent an automaton state.
c    -(-b^{1, 540}_2 ∧  b^{1, 540}_1 ∧  b^{1, 540}_0 ∧ true) 
c  in CNF:
c     b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ false 
c  in DIMACS:
 2780 -2781 -2782  0
c  -3 does not represent an automaton state.
c    -( b^{1, 540}_2 ∧  b^{1, 540}_1 ∧  b^{1, 540}_0 ∧ true) 
c  in CNF:
c    -b^{1, 540}_2 ∨ -b^{1, 540}_1 ∨ -b^{1, 540}_0 ∨ false 
c  in DIMACS:
-2780 -2781 -2782  0

c i = 541
c  -2+1 --> -1
c    ( b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧  p_541) -> ( b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0)
c  in CNF:
c    -b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨  b^{1, 542}_2
c    -b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_1
c    -b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨  b^{1, 542}_0
c  in DIMACS:
-2783 -2784  2785 -541  2786 0
-2783 -2784  2785 -541 -2787 0
-2783 -2784  2785 -541  2788 0

c  -1+1 --> 0
c    ( b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0 ∧  p_541) -> (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧ -b^{1, 542}_0)
c  in CNF:
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_2
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_1
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_0
c  in DIMACS:
-2783  2784 -2785 -541 -2786 0
-2783  2784 -2785 -541 -2787 0
-2783  2784 -2785 -541 -2788 0

c  0+1 --> 1
c    (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧  p_541) -> (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0)
c  in CNF:
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_2
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_1
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨  b^{1, 542}_0
c  in DIMACS:
 2783  2784  2785 -541 -2786 0
 2783  2784  2785 -541 -2787 0
 2783  2784  2785 -541  2788 0

c  1+1 --> 2
c    (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0 ∧  p_541) -> (-b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0)
c  in CNF:
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_2
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨  b^{1, 542}_1
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ -p_541 ∨ -b^{1, 542}_0
c  in DIMACS:
 2783  2784 -2785 -541 -2786 0
 2783  2784 -2785 -541  2787 0
 2783  2784 -2785 -541 -2788 0

c  2+1 --> break 
c    (-b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧  p_541) -> break
c  in CNF:
c     b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ -p_541 ∨ break
c  in DIMACS:
 2783 -2784  2785 -541 1162 0


c  2-1 --> 1
c    (-b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧ -p_541) -> (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0)
c  in CNF:
c     b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_2
c     b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_1
c     b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨  b^{1, 542}_0
c  in DIMACS:
 2783 -2784  2785  541 -2786 0
 2783 -2784  2785  541 -2787 0
 2783 -2784  2785  541  2788 0

c  1-1 --> 0
c    (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0 ∧ -p_541) -> (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧ -b^{1, 542}_0)
c  in CNF:
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_2
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_1
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_0
c  in DIMACS:
 2783  2784 -2785  541 -2786 0
 2783  2784 -2785  541 -2787 0
 2783  2784 -2785  541 -2788 0

c  0-1 --> -1
c    (-b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧ -p_541) -> ( b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0)
c  in CNF:
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨  b^{1, 542}_2
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_1
c     b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨  b^{1, 542}_0
c  in DIMACS:
 2783  2784  2785  541  2786 0
 2783  2784  2785  541 -2787 0
 2783  2784  2785  541  2788 0

c  -1-1 --> -2
c    ( b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧  b^{1, 541}_0 ∧ -p_541) -> ( b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0)
c  in CNF:
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨  b^{1, 542}_2
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨  b^{1, 542}_1
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨  p_541 ∨ -b^{1, 542}_0
c  in DIMACS:
-2783  2784 -2785  541  2786 0
-2783  2784 -2785  541  2787 0
-2783  2784 -2785  541 -2788 0

c  -2-1 --> break 
c    ( b^{1, 541}_2 ∧  b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧ -p_541) -> break
c  in CNF:
c    -b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨  b^{1, 541}_0 ∨  p_541 ∨ break
c  in DIMACS:
-2783 -2784  2785  541 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 541}_2 ∧ -b^{1, 541}_1 ∧ -b^{1, 541}_0 ∧ true) 
c  in CNF:
c    -b^{1, 541}_2 ∨  b^{1, 541}_1 ∨  b^{1, 541}_0 ∨ false 
c  in DIMACS:
-2783  2784  2785  0

c  3 does not represent an automaton state.
c    -(-b^{1, 541}_2 ∧  b^{1, 541}_1 ∧  b^{1, 541}_0 ∧ true) 
c  in CNF:
c     b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ false 
c  in DIMACS:
 2783 -2784 -2785  0
c  -3 does not represent an automaton state.
c    -( b^{1, 541}_2 ∧  b^{1, 541}_1 ∧  b^{1, 541}_0 ∧ true) 
c  in CNF:
c    -b^{1, 541}_2 ∨ -b^{1, 541}_1 ∨ -b^{1, 541}_0 ∨ false 
c  in DIMACS:
-2783 -2784 -2785  0

c i = 542
c  -2+1 --> -1
c    ( b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧  p_542) -> ( b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0)
c  in CNF:
c    -b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨  b^{1, 543}_2
c    -b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_1
c    -b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨  b^{1, 543}_0
c  in DIMACS:
-2786 -2787  2788 -542  2789 0
-2786 -2787  2788 -542 -2790 0
-2786 -2787  2788 -542  2791 0

c  -1+1 --> 0
c    ( b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0 ∧  p_542) -> (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧ -b^{1, 543}_0)
c  in CNF:
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_2
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_1
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_0
c  in DIMACS:
-2786  2787 -2788 -542 -2789 0
-2786  2787 -2788 -542 -2790 0
-2786  2787 -2788 -542 -2791 0

c  0+1 --> 1
c    (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧  p_542) -> (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0)
c  in CNF:
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_2
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_1
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨  b^{1, 543}_0
c  in DIMACS:
 2786  2787  2788 -542 -2789 0
 2786  2787  2788 -542 -2790 0
 2786  2787  2788 -542  2791 0

c  1+1 --> 2
c    (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0 ∧  p_542) -> (-b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0)
c  in CNF:
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_2
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨  b^{1, 543}_1
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ -p_542 ∨ -b^{1, 543}_0
c  in DIMACS:
 2786  2787 -2788 -542 -2789 0
 2786  2787 -2788 -542  2790 0
 2786  2787 -2788 -542 -2791 0

c  2+1 --> break 
c    (-b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧  p_542) -> break
c  in CNF:
c     b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ -p_542 ∨ break
c  in DIMACS:
 2786 -2787  2788 -542 1162 0


c  2-1 --> 1
c    (-b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧ -p_542) -> (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0)
c  in CNF:
c     b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_2
c     b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_1
c     b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨  b^{1, 543}_0
c  in DIMACS:
 2786 -2787  2788  542 -2789 0
 2786 -2787  2788  542 -2790 0
 2786 -2787  2788  542  2791 0

c  1-1 --> 0
c    (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0 ∧ -p_542) -> (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧ -b^{1, 543}_0)
c  in CNF:
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_2
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_1
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_0
c  in DIMACS:
 2786  2787 -2788  542 -2789 0
 2786  2787 -2788  542 -2790 0
 2786  2787 -2788  542 -2791 0

c  0-1 --> -1
c    (-b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧ -p_542) -> ( b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0)
c  in CNF:
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨  b^{1, 543}_2
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_1
c     b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨  b^{1, 543}_0
c  in DIMACS:
 2786  2787  2788  542  2789 0
 2786  2787  2788  542 -2790 0
 2786  2787  2788  542  2791 0

c  -1-1 --> -2
c    ( b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧  b^{1, 542}_0 ∧ -p_542) -> ( b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0)
c  in CNF:
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨  b^{1, 543}_2
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨  b^{1, 543}_1
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨  p_542 ∨ -b^{1, 543}_0
c  in DIMACS:
-2786  2787 -2788  542  2789 0
-2786  2787 -2788  542  2790 0
-2786  2787 -2788  542 -2791 0

c  -2-1 --> break 
c    ( b^{1, 542}_2 ∧  b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧ -p_542) -> break
c  in CNF:
c    -b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨  b^{1, 542}_0 ∨  p_542 ∨ break
c  in DIMACS:
-2786 -2787  2788  542 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 542}_2 ∧ -b^{1, 542}_1 ∧ -b^{1, 542}_0 ∧ true) 
c  in CNF:
c    -b^{1, 542}_2 ∨  b^{1, 542}_1 ∨  b^{1, 542}_0 ∨ false 
c  in DIMACS:
-2786  2787  2788  0

c  3 does not represent an automaton state.
c    -(-b^{1, 542}_2 ∧  b^{1, 542}_1 ∧  b^{1, 542}_0 ∧ true) 
c  in CNF:
c     b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ false 
c  in DIMACS:
 2786 -2787 -2788  0
c  -3 does not represent an automaton state.
c    -( b^{1, 542}_2 ∧  b^{1, 542}_1 ∧  b^{1, 542}_0 ∧ true) 
c  in CNF:
c    -b^{1, 542}_2 ∨ -b^{1, 542}_1 ∨ -b^{1, 542}_0 ∨ false 
c  in DIMACS:
-2786 -2787 -2788  0

c i = 543
c  -2+1 --> -1
c    ( b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧  p_543) -> ( b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0)
c  in CNF:
c    -b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨  b^{1, 544}_2
c    -b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_1
c    -b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨  b^{1, 544}_0
c  in DIMACS:
-2789 -2790  2791 -543  2792 0
-2789 -2790  2791 -543 -2793 0
-2789 -2790  2791 -543  2794 0

c  -1+1 --> 0
c    ( b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0 ∧  p_543) -> (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧ -b^{1, 544}_0)
c  in CNF:
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_2
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_1
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_0
c  in DIMACS:
-2789  2790 -2791 -543 -2792 0
-2789  2790 -2791 -543 -2793 0
-2789  2790 -2791 -543 -2794 0

c  0+1 --> 1
c    (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧  p_543) -> (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0)
c  in CNF:
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_2
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_1
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨  b^{1, 544}_0
c  in DIMACS:
 2789  2790  2791 -543 -2792 0
 2789  2790  2791 -543 -2793 0
 2789  2790  2791 -543  2794 0

c  1+1 --> 2
c    (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0 ∧  p_543) -> (-b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0)
c  in CNF:
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_2
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨  b^{1, 544}_1
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ -p_543 ∨ -b^{1, 544}_0
c  in DIMACS:
 2789  2790 -2791 -543 -2792 0
 2789  2790 -2791 -543  2793 0
 2789  2790 -2791 -543 -2794 0

c  2+1 --> break 
c    (-b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧  p_543) -> break
c  in CNF:
c     b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ -p_543 ∨ break
c  in DIMACS:
 2789 -2790  2791 -543 1162 0


c  2-1 --> 1
c    (-b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧ -p_543) -> (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0)
c  in CNF:
c     b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_2
c     b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_1
c     b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨  b^{1, 544}_0
c  in DIMACS:
 2789 -2790  2791  543 -2792 0
 2789 -2790  2791  543 -2793 0
 2789 -2790  2791  543  2794 0

c  1-1 --> 0
c    (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0 ∧ -p_543) -> (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧ -b^{1, 544}_0)
c  in CNF:
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_2
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_1
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_0
c  in DIMACS:
 2789  2790 -2791  543 -2792 0
 2789  2790 -2791  543 -2793 0
 2789  2790 -2791  543 -2794 0

c  0-1 --> -1
c    (-b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧ -p_543) -> ( b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0)
c  in CNF:
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨  b^{1, 544}_2
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_1
c     b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨  b^{1, 544}_0
c  in DIMACS:
 2789  2790  2791  543  2792 0
 2789  2790  2791  543 -2793 0
 2789  2790  2791  543  2794 0

c  -1-1 --> -2
c    ( b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧  b^{1, 543}_0 ∧ -p_543) -> ( b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0)
c  in CNF:
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨  b^{1, 544}_2
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨  b^{1, 544}_1
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨  p_543 ∨ -b^{1, 544}_0
c  in DIMACS:
-2789  2790 -2791  543  2792 0
-2789  2790 -2791  543  2793 0
-2789  2790 -2791  543 -2794 0

c  -2-1 --> break 
c    ( b^{1, 543}_2 ∧  b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧ -p_543) -> break
c  in CNF:
c    -b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨  b^{1, 543}_0 ∨  p_543 ∨ break
c  in DIMACS:
-2789 -2790  2791  543 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 543}_2 ∧ -b^{1, 543}_1 ∧ -b^{1, 543}_0 ∧ true) 
c  in CNF:
c    -b^{1, 543}_2 ∨  b^{1, 543}_1 ∨  b^{1, 543}_0 ∨ false 
c  in DIMACS:
-2789  2790  2791  0

c  3 does not represent an automaton state.
c    -(-b^{1, 543}_2 ∧  b^{1, 543}_1 ∧  b^{1, 543}_0 ∧ true) 
c  in CNF:
c     b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ false 
c  in DIMACS:
 2789 -2790 -2791  0
c  -3 does not represent an automaton state.
c    -( b^{1, 543}_2 ∧  b^{1, 543}_1 ∧  b^{1, 543}_0 ∧ true) 
c  in CNF:
c    -b^{1, 543}_2 ∨ -b^{1, 543}_1 ∨ -b^{1, 543}_0 ∨ false 
c  in DIMACS:
-2789 -2790 -2791  0

c i = 544
c  -2+1 --> -1
c    ( b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧  p_544) -> ( b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0)
c  in CNF:
c    -b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨  b^{1, 545}_2
c    -b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_1
c    -b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨  b^{1, 545}_0
c  in DIMACS:
-2792 -2793  2794 -544  2795 0
-2792 -2793  2794 -544 -2796 0
-2792 -2793  2794 -544  2797 0

c  -1+1 --> 0
c    ( b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0 ∧  p_544) -> (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧ -b^{1, 545}_0)
c  in CNF:
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_2
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_1
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_0
c  in DIMACS:
-2792  2793 -2794 -544 -2795 0
-2792  2793 -2794 -544 -2796 0
-2792  2793 -2794 -544 -2797 0

c  0+1 --> 1
c    (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧  p_544) -> (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0)
c  in CNF:
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_2
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_1
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨  b^{1, 545}_0
c  in DIMACS:
 2792  2793  2794 -544 -2795 0
 2792  2793  2794 -544 -2796 0
 2792  2793  2794 -544  2797 0

c  1+1 --> 2
c    (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0 ∧  p_544) -> (-b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0)
c  in CNF:
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_2
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨  b^{1, 545}_1
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ -p_544 ∨ -b^{1, 545}_0
c  in DIMACS:
 2792  2793 -2794 -544 -2795 0
 2792  2793 -2794 -544  2796 0
 2792  2793 -2794 -544 -2797 0

c  2+1 --> break 
c    (-b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧  p_544) -> break
c  in CNF:
c     b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 2792 -2793  2794 -544 1162 0


c  2-1 --> 1
c    (-b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧ -p_544) -> (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0)
c  in CNF:
c     b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_2
c     b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_1
c     b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨  b^{1, 545}_0
c  in DIMACS:
 2792 -2793  2794  544 -2795 0
 2792 -2793  2794  544 -2796 0
 2792 -2793  2794  544  2797 0

c  1-1 --> 0
c    (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0 ∧ -p_544) -> (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧ -b^{1, 545}_0)
c  in CNF:
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_2
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_1
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_0
c  in DIMACS:
 2792  2793 -2794  544 -2795 0
 2792  2793 -2794  544 -2796 0
 2792  2793 -2794  544 -2797 0

c  0-1 --> -1
c    (-b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧ -p_544) -> ( b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0)
c  in CNF:
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨  b^{1, 545}_2
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_1
c     b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨  b^{1, 545}_0
c  in DIMACS:
 2792  2793  2794  544  2795 0
 2792  2793  2794  544 -2796 0
 2792  2793  2794  544  2797 0

c  -1-1 --> -2
c    ( b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧  b^{1, 544}_0 ∧ -p_544) -> ( b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0)
c  in CNF:
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨  b^{1, 545}_2
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨  b^{1, 545}_1
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨  p_544 ∨ -b^{1, 545}_0
c  in DIMACS:
-2792  2793 -2794  544  2795 0
-2792  2793 -2794  544  2796 0
-2792  2793 -2794  544 -2797 0

c  -2-1 --> break 
c    ( b^{1, 544}_2 ∧  b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨  b^{1, 544}_0 ∨  p_544 ∨ break
c  in DIMACS:
-2792 -2793  2794  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 544}_2 ∧ -b^{1, 544}_1 ∧ -b^{1, 544}_0 ∧ true) 
c  in CNF:
c    -b^{1, 544}_2 ∨  b^{1, 544}_1 ∨  b^{1, 544}_0 ∨ false 
c  in DIMACS:
-2792  2793  2794  0

c  3 does not represent an automaton state.
c    -(-b^{1, 544}_2 ∧  b^{1, 544}_1 ∧  b^{1, 544}_0 ∧ true) 
c  in CNF:
c     b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ false 
c  in DIMACS:
 2792 -2793 -2794  0
c  -3 does not represent an automaton state.
c    -( b^{1, 544}_2 ∧  b^{1, 544}_1 ∧  b^{1, 544}_0 ∧ true) 
c  in CNF:
c    -b^{1, 544}_2 ∨ -b^{1, 544}_1 ∨ -b^{1, 544}_0 ∨ false 
c  in DIMACS:
-2792 -2793 -2794  0

c i = 545
c  -2+1 --> -1
c    ( b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧  p_545) -> ( b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0)
c  in CNF:
c    -b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨  b^{1, 546}_2
c    -b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_1
c    -b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨  b^{1, 546}_0
c  in DIMACS:
-2795 -2796  2797 -545  2798 0
-2795 -2796  2797 -545 -2799 0
-2795 -2796  2797 -545  2800 0

c  -1+1 --> 0
c    ( b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0 ∧  p_545) -> (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧ -b^{1, 546}_0)
c  in CNF:
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_2
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_1
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_0
c  in DIMACS:
-2795  2796 -2797 -545 -2798 0
-2795  2796 -2797 -545 -2799 0
-2795  2796 -2797 -545 -2800 0

c  0+1 --> 1
c    (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧  p_545) -> (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0)
c  in CNF:
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_2
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_1
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨  b^{1, 546}_0
c  in DIMACS:
 2795  2796  2797 -545 -2798 0
 2795  2796  2797 -545 -2799 0
 2795  2796  2797 -545  2800 0

c  1+1 --> 2
c    (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0 ∧  p_545) -> (-b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0)
c  in CNF:
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_2
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨  b^{1, 546}_1
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ -p_545 ∨ -b^{1, 546}_0
c  in DIMACS:
 2795  2796 -2797 -545 -2798 0
 2795  2796 -2797 -545  2799 0
 2795  2796 -2797 -545 -2800 0

c  2+1 --> break 
c    (-b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧  p_545) -> break
c  in CNF:
c     b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ -p_545 ∨ break
c  in DIMACS:
 2795 -2796  2797 -545 1162 0


c  2-1 --> 1
c    (-b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧ -p_545) -> (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0)
c  in CNF:
c     b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_2
c     b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_1
c     b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨  b^{1, 546}_0
c  in DIMACS:
 2795 -2796  2797  545 -2798 0
 2795 -2796  2797  545 -2799 0
 2795 -2796  2797  545  2800 0

c  1-1 --> 0
c    (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0 ∧ -p_545) -> (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧ -b^{1, 546}_0)
c  in CNF:
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_2
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_1
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_0
c  in DIMACS:
 2795  2796 -2797  545 -2798 0
 2795  2796 -2797  545 -2799 0
 2795  2796 -2797  545 -2800 0

c  0-1 --> -1
c    (-b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧ -p_545) -> ( b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0)
c  in CNF:
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨  b^{1, 546}_2
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_1
c     b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨  b^{1, 546}_0
c  in DIMACS:
 2795  2796  2797  545  2798 0
 2795  2796  2797  545 -2799 0
 2795  2796  2797  545  2800 0

c  -1-1 --> -2
c    ( b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧  b^{1, 545}_0 ∧ -p_545) -> ( b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0)
c  in CNF:
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨  b^{1, 546}_2
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨  b^{1, 546}_1
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨  p_545 ∨ -b^{1, 546}_0
c  in DIMACS:
-2795  2796 -2797  545  2798 0
-2795  2796 -2797  545  2799 0
-2795  2796 -2797  545 -2800 0

c  -2-1 --> break 
c    ( b^{1, 545}_2 ∧  b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧ -p_545) -> break
c  in CNF:
c    -b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨  b^{1, 545}_0 ∨  p_545 ∨ break
c  in DIMACS:
-2795 -2796  2797  545 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 545}_2 ∧ -b^{1, 545}_1 ∧ -b^{1, 545}_0 ∧ true) 
c  in CNF:
c    -b^{1, 545}_2 ∨  b^{1, 545}_1 ∨  b^{1, 545}_0 ∨ false 
c  in DIMACS:
-2795  2796  2797  0

c  3 does not represent an automaton state.
c    -(-b^{1, 545}_2 ∧  b^{1, 545}_1 ∧  b^{1, 545}_0 ∧ true) 
c  in CNF:
c     b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ false 
c  in DIMACS:
 2795 -2796 -2797  0
c  -3 does not represent an automaton state.
c    -( b^{1, 545}_2 ∧  b^{1, 545}_1 ∧  b^{1, 545}_0 ∧ true) 
c  in CNF:
c    -b^{1, 545}_2 ∨ -b^{1, 545}_1 ∨ -b^{1, 545}_0 ∨ false 
c  in DIMACS:
-2795 -2796 -2797  0

c i = 546
c  -2+1 --> -1
c    ( b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧  p_546) -> ( b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0)
c  in CNF:
c    -b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨  b^{1, 547}_2
c    -b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_1
c    -b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨  b^{1, 547}_0
c  in DIMACS:
-2798 -2799  2800 -546  2801 0
-2798 -2799  2800 -546 -2802 0
-2798 -2799  2800 -546  2803 0

c  -1+1 --> 0
c    ( b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0 ∧  p_546) -> (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧ -b^{1, 547}_0)
c  in CNF:
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_2
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_1
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_0
c  in DIMACS:
-2798  2799 -2800 -546 -2801 0
-2798  2799 -2800 -546 -2802 0
-2798  2799 -2800 -546 -2803 0

c  0+1 --> 1
c    (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧  p_546) -> (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0)
c  in CNF:
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_2
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_1
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨  b^{1, 547}_0
c  in DIMACS:
 2798  2799  2800 -546 -2801 0
 2798  2799  2800 -546 -2802 0
 2798  2799  2800 -546  2803 0

c  1+1 --> 2
c    (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0 ∧  p_546) -> (-b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0)
c  in CNF:
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_2
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨  b^{1, 547}_1
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ -p_546 ∨ -b^{1, 547}_0
c  in DIMACS:
 2798  2799 -2800 -546 -2801 0
 2798  2799 -2800 -546  2802 0
 2798  2799 -2800 -546 -2803 0

c  2+1 --> break 
c    (-b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧  p_546) -> break
c  in CNF:
c     b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 2798 -2799  2800 -546 1162 0


c  2-1 --> 1
c    (-b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧ -p_546) -> (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0)
c  in CNF:
c     b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_2
c     b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_1
c     b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨  b^{1, 547}_0
c  in DIMACS:
 2798 -2799  2800  546 -2801 0
 2798 -2799  2800  546 -2802 0
 2798 -2799  2800  546  2803 0

c  1-1 --> 0
c    (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0 ∧ -p_546) -> (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧ -b^{1, 547}_0)
c  in CNF:
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_2
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_1
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_0
c  in DIMACS:
 2798  2799 -2800  546 -2801 0
 2798  2799 -2800  546 -2802 0
 2798  2799 -2800  546 -2803 0

c  0-1 --> -1
c    (-b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧ -p_546) -> ( b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0)
c  in CNF:
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨  b^{1, 547}_2
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_1
c     b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨  b^{1, 547}_0
c  in DIMACS:
 2798  2799  2800  546  2801 0
 2798  2799  2800  546 -2802 0
 2798  2799  2800  546  2803 0

c  -1-1 --> -2
c    ( b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧  b^{1, 546}_0 ∧ -p_546) -> ( b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0)
c  in CNF:
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨  b^{1, 547}_2
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨  b^{1, 547}_1
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨  p_546 ∨ -b^{1, 547}_0
c  in DIMACS:
-2798  2799 -2800  546  2801 0
-2798  2799 -2800  546  2802 0
-2798  2799 -2800  546 -2803 0

c  -2-1 --> break 
c    ( b^{1, 546}_2 ∧  b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨  b^{1, 546}_0 ∨  p_546 ∨ break
c  in DIMACS:
-2798 -2799  2800  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 546}_2 ∧ -b^{1, 546}_1 ∧ -b^{1, 546}_0 ∧ true) 
c  in CNF:
c    -b^{1, 546}_2 ∨  b^{1, 546}_1 ∨  b^{1, 546}_0 ∨ false 
c  in DIMACS:
-2798  2799  2800  0

c  3 does not represent an automaton state.
c    -(-b^{1, 546}_2 ∧  b^{1, 546}_1 ∧  b^{1, 546}_0 ∧ true) 
c  in CNF:
c     b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ false 
c  in DIMACS:
 2798 -2799 -2800  0
c  -3 does not represent an automaton state.
c    -( b^{1, 546}_2 ∧  b^{1, 546}_1 ∧  b^{1, 546}_0 ∧ true) 
c  in CNF:
c    -b^{1, 546}_2 ∨ -b^{1, 546}_1 ∨ -b^{1, 546}_0 ∨ false 
c  in DIMACS:
-2798 -2799 -2800  0

c i = 547
c  -2+1 --> -1
c    ( b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧  p_547) -> ( b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0)
c  in CNF:
c    -b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨  b^{1, 548}_2
c    -b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_1
c    -b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨  b^{1, 548}_0
c  in DIMACS:
-2801 -2802  2803 -547  2804 0
-2801 -2802  2803 -547 -2805 0
-2801 -2802  2803 -547  2806 0

c  -1+1 --> 0
c    ( b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0 ∧  p_547) -> (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧ -b^{1, 548}_0)
c  in CNF:
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_2
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_1
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_0
c  in DIMACS:
-2801  2802 -2803 -547 -2804 0
-2801  2802 -2803 -547 -2805 0
-2801  2802 -2803 -547 -2806 0

c  0+1 --> 1
c    (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧  p_547) -> (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0)
c  in CNF:
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_2
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_1
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨  b^{1, 548}_0
c  in DIMACS:
 2801  2802  2803 -547 -2804 0
 2801  2802  2803 -547 -2805 0
 2801  2802  2803 -547  2806 0

c  1+1 --> 2
c    (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0 ∧  p_547) -> (-b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0)
c  in CNF:
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_2
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨  b^{1, 548}_1
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ -p_547 ∨ -b^{1, 548}_0
c  in DIMACS:
 2801  2802 -2803 -547 -2804 0
 2801  2802 -2803 -547  2805 0
 2801  2802 -2803 -547 -2806 0

c  2+1 --> break 
c    (-b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧  p_547) -> break
c  in CNF:
c     b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ -p_547 ∨ break
c  in DIMACS:
 2801 -2802  2803 -547 1162 0


c  2-1 --> 1
c    (-b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧ -p_547) -> (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0)
c  in CNF:
c     b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_2
c     b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_1
c     b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨  b^{1, 548}_0
c  in DIMACS:
 2801 -2802  2803  547 -2804 0
 2801 -2802  2803  547 -2805 0
 2801 -2802  2803  547  2806 0

c  1-1 --> 0
c    (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0 ∧ -p_547) -> (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧ -b^{1, 548}_0)
c  in CNF:
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_2
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_1
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_0
c  in DIMACS:
 2801  2802 -2803  547 -2804 0
 2801  2802 -2803  547 -2805 0
 2801  2802 -2803  547 -2806 0

c  0-1 --> -1
c    (-b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧ -p_547) -> ( b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0)
c  in CNF:
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨  b^{1, 548}_2
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_1
c     b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨  b^{1, 548}_0
c  in DIMACS:
 2801  2802  2803  547  2804 0
 2801  2802  2803  547 -2805 0
 2801  2802  2803  547  2806 0

c  -1-1 --> -2
c    ( b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧  b^{1, 547}_0 ∧ -p_547) -> ( b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0)
c  in CNF:
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨  b^{1, 548}_2
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨  b^{1, 548}_1
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨  p_547 ∨ -b^{1, 548}_0
c  in DIMACS:
-2801  2802 -2803  547  2804 0
-2801  2802 -2803  547  2805 0
-2801  2802 -2803  547 -2806 0

c  -2-1 --> break 
c    ( b^{1, 547}_2 ∧  b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧ -p_547) -> break
c  in CNF:
c    -b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨  b^{1, 547}_0 ∨  p_547 ∨ break
c  in DIMACS:
-2801 -2802  2803  547 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 547}_2 ∧ -b^{1, 547}_1 ∧ -b^{1, 547}_0 ∧ true) 
c  in CNF:
c    -b^{1, 547}_2 ∨  b^{1, 547}_1 ∨  b^{1, 547}_0 ∨ false 
c  in DIMACS:
-2801  2802  2803  0

c  3 does not represent an automaton state.
c    -(-b^{1, 547}_2 ∧  b^{1, 547}_1 ∧  b^{1, 547}_0 ∧ true) 
c  in CNF:
c     b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ false 
c  in DIMACS:
 2801 -2802 -2803  0
c  -3 does not represent an automaton state.
c    -( b^{1, 547}_2 ∧  b^{1, 547}_1 ∧  b^{1, 547}_0 ∧ true) 
c  in CNF:
c    -b^{1, 547}_2 ∨ -b^{1, 547}_1 ∨ -b^{1, 547}_0 ∨ false 
c  in DIMACS:
-2801 -2802 -2803  0

c i = 548
c  -2+1 --> -1
c    ( b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧  p_548) -> ( b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0)
c  in CNF:
c    -b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨  b^{1, 549}_2
c    -b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_1
c    -b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨  b^{1, 549}_0
c  in DIMACS:
-2804 -2805  2806 -548  2807 0
-2804 -2805  2806 -548 -2808 0
-2804 -2805  2806 -548  2809 0

c  -1+1 --> 0
c    ( b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0 ∧  p_548) -> (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧ -b^{1, 549}_0)
c  in CNF:
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_2
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_1
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_0
c  in DIMACS:
-2804  2805 -2806 -548 -2807 0
-2804  2805 -2806 -548 -2808 0
-2804  2805 -2806 -548 -2809 0

c  0+1 --> 1
c    (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧  p_548) -> (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0)
c  in CNF:
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_2
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_1
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨  b^{1, 549}_0
c  in DIMACS:
 2804  2805  2806 -548 -2807 0
 2804  2805  2806 -548 -2808 0
 2804  2805  2806 -548  2809 0

c  1+1 --> 2
c    (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0 ∧  p_548) -> (-b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0)
c  in CNF:
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_2
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨  b^{1, 549}_1
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ -p_548 ∨ -b^{1, 549}_0
c  in DIMACS:
 2804  2805 -2806 -548 -2807 0
 2804  2805 -2806 -548  2808 0
 2804  2805 -2806 -548 -2809 0

c  2+1 --> break 
c    (-b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧  p_548) -> break
c  in CNF:
c     b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ -p_548 ∨ break
c  in DIMACS:
 2804 -2805  2806 -548 1162 0


c  2-1 --> 1
c    (-b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧ -p_548) -> (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0)
c  in CNF:
c     b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_2
c     b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_1
c     b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨  b^{1, 549}_0
c  in DIMACS:
 2804 -2805  2806  548 -2807 0
 2804 -2805  2806  548 -2808 0
 2804 -2805  2806  548  2809 0

c  1-1 --> 0
c    (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0 ∧ -p_548) -> (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧ -b^{1, 549}_0)
c  in CNF:
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_2
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_1
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_0
c  in DIMACS:
 2804  2805 -2806  548 -2807 0
 2804  2805 -2806  548 -2808 0
 2804  2805 -2806  548 -2809 0

c  0-1 --> -1
c    (-b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧ -p_548) -> ( b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0)
c  in CNF:
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨  b^{1, 549}_2
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_1
c     b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨  b^{1, 549}_0
c  in DIMACS:
 2804  2805  2806  548  2807 0
 2804  2805  2806  548 -2808 0
 2804  2805  2806  548  2809 0

c  -1-1 --> -2
c    ( b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧  b^{1, 548}_0 ∧ -p_548) -> ( b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0)
c  in CNF:
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨  b^{1, 549}_2
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨  b^{1, 549}_1
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨  p_548 ∨ -b^{1, 549}_0
c  in DIMACS:
-2804  2805 -2806  548  2807 0
-2804  2805 -2806  548  2808 0
-2804  2805 -2806  548 -2809 0

c  -2-1 --> break 
c    ( b^{1, 548}_2 ∧  b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧ -p_548) -> break
c  in CNF:
c    -b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨  b^{1, 548}_0 ∨  p_548 ∨ break
c  in DIMACS:
-2804 -2805  2806  548 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 548}_2 ∧ -b^{1, 548}_1 ∧ -b^{1, 548}_0 ∧ true) 
c  in CNF:
c    -b^{1, 548}_2 ∨  b^{1, 548}_1 ∨  b^{1, 548}_0 ∨ false 
c  in DIMACS:
-2804  2805  2806  0

c  3 does not represent an automaton state.
c    -(-b^{1, 548}_2 ∧  b^{1, 548}_1 ∧  b^{1, 548}_0 ∧ true) 
c  in CNF:
c     b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ false 
c  in DIMACS:
 2804 -2805 -2806  0
c  -3 does not represent an automaton state.
c    -( b^{1, 548}_2 ∧  b^{1, 548}_1 ∧  b^{1, 548}_0 ∧ true) 
c  in CNF:
c    -b^{1, 548}_2 ∨ -b^{1, 548}_1 ∨ -b^{1, 548}_0 ∨ false 
c  in DIMACS:
-2804 -2805 -2806  0

c i = 549
c  -2+1 --> -1
c    ( b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧  p_549) -> ( b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0)
c  in CNF:
c    -b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨  b^{1, 550}_2
c    -b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_1
c    -b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨  b^{1, 550}_0
c  in DIMACS:
-2807 -2808  2809 -549  2810 0
-2807 -2808  2809 -549 -2811 0
-2807 -2808  2809 -549  2812 0

c  -1+1 --> 0
c    ( b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0 ∧  p_549) -> (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧ -b^{1, 550}_0)
c  in CNF:
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_2
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_1
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_0
c  in DIMACS:
-2807  2808 -2809 -549 -2810 0
-2807  2808 -2809 -549 -2811 0
-2807  2808 -2809 -549 -2812 0

c  0+1 --> 1
c    (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧  p_549) -> (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0)
c  in CNF:
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_2
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_1
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨  b^{1, 550}_0
c  in DIMACS:
 2807  2808  2809 -549 -2810 0
 2807  2808  2809 -549 -2811 0
 2807  2808  2809 -549  2812 0

c  1+1 --> 2
c    (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0 ∧  p_549) -> (-b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0)
c  in CNF:
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_2
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨  b^{1, 550}_1
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ -p_549 ∨ -b^{1, 550}_0
c  in DIMACS:
 2807  2808 -2809 -549 -2810 0
 2807  2808 -2809 -549  2811 0
 2807  2808 -2809 -549 -2812 0

c  2+1 --> break 
c    (-b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧  p_549) -> break
c  in CNF:
c     b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ -p_549 ∨ break
c  in DIMACS:
 2807 -2808  2809 -549 1162 0


c  2-1 --> 1
c    (-b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧ -p_549) -> (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0)
c  in CNF:
c     b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_2
c     b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_1
c     b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨  b^{1, 550}_0
c  in DIMACS:
 2807 -2808  2809  549 -2810 0
 2807 -2808  2809  549 -2811 0
 2807 -2808  2809  549  2812 0

c  1-1 --> 0
c    (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0 ∧ -p_549) -> (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧ -b^{1, 550}_0)
c  in CNF:
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_2
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_1
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_0
c  in DIMACS:
 2807  2808 -2809  549 -2810 0
 2807  2808 -2809  549 -2811 0
 2807  2808 -2809  549 -2812 0

c  0-1 --> -1
c    (-b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧ -p_549) -> ( b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0)
c  in CNF:
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨  b^{1, 550}_2
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_1
c     b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨  b^{1, 550}_0
c  in DIMACS:
 2807  2808  2809  549  2810 0
 2807  2808  2809  549 -2811 0
 2807  2808  2809  549  2812 0

c  -1-1 --> -2
c    ( b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧  b^{1, 549}_0 ∧ -p_549) -> ( b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0)
c  in CNF:
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨  b^{1, 550}_2
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨  b^{1, 550}_1
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨  p_549 ∨ -b^{1, 550}_0
c  in DIMACS:
-2807  2808 -2809  549  2810 0
-2807  2808 -2809  549  2811 0
-2807  2808 -2809  549 -2812 0

c  -2-1 --> break 
c    ( b^{1, 549}_2 ∧  b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧ -p_549) -> break
c  in CNF:
c    -b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨  b^{1, 549}_0 ∨  p_549 ∨ break
c  in DIMACS:
-2807 -2808  2809  549 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 549}_2 ∧ -b^{1, 549}_1 ∧ -b^{1, 549}_0 ∧ true) 
c  in CNF:
c    -b^{1, 549}_2 ∨  b^{1, 549}_1 ∨  b^{1, 549}_0 ∨ false 
c  in DIMACS:
-2807  2808  2809  0

c  3 does not represent an automaton state.
c    -(-b^{1, 549}_2 ∧  b^{1, 549}_1 ∧  b^{1, 549}_0 ∧ true) 
c  in CNF:
c     b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ false 
c  in DIMACS:
 2807 -2808 -2809  0
c  -3 does not represent an automaton state.
c    -( b^{1, 549}_2 ∧  b^{1, 549}_1 ∧  b^{1, 549}_0 ∧ true) 
c  in CNF:
c    -b^{1, 549}_2 ∨ -b^{1, 549}_1 ∨ -b^{1, 549}_0 ∨ false 
c  in DIMACS:
-2807 -2808 -2809  0

c i = 550
c  -2+1 --> -1
c    ( b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧  p_550) -> ( b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0)
c  in CNF:
c    -b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨  b^{1, 551}_2
c    -b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_1
c    -b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨  b^{1, 551}_0
c  in DIMACS:
-2810 -2811  2812 -550  2813 0
-2810 -2811  2812 -550 -2814 0
-2810 -2811  2812 -550  2815 0

c  -1+1 --> 0
c    ( b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0 ∧  p_550) -> (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧ -b^{1, 551}_0)
c  in CNF:
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_2
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_1
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_0
c  in DIMACS:
-2810  2811 -2812 -550 -2813 0
-2810  2811 -2812 -550 -2814 0
-2810  2811 -2812 -550 -2815 0

c  0+1 --> 1
c    (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧  p_550) -> (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0)
c  in CNF:
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_2
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_1
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨  b^{1, 551}_0
c  in DIMACS:
 2810  2811  2812 -550 -2813 0
 2810  2811  2812 -550 -2814 0
 2810  2811  2812 -550  2815 0

c  1+1 --> 2
c    (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0 ∧  p_550) -> (-b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0)
c  in CNF:
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_2
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨  b^{1, 551}_1
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ -p_550 ∨ -b^{1, 551}_0
c  in DIMACS:
 2810  2811 -2812 -550 -2813 0
 2810  2811 -2812 -550  2814 0
 2810  2811 -2812 -550 -2815 0

c  2+1 --> break 
c    (-b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧  p_550) -> break
c  in CNF:
c     b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 2810 -2811  2812 -550 1162 0


c  2-1 --> 1
c    (-b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧ -p_550) -> (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0)
c  in CNF:
c     b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_2
c     b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_1
c     b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨  b^{1, 551}_0
c  in DIMACS:
 2810 -2811  2812  550 -2813 0
 2810 -2811  2812  550 -2814 0
 2810 -2811  2812  550  2815 0

c  1-1 --> 0
c    (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0 ∧ -p_550) -> (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧ -b^{1, 551}_0)
c  in CNF:
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_2
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_1
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_0
c  in DIMACS:
 2810  2811 -2812  550 -2813 0
 2810  2811 -2812  550 -2814 0
 2810  2811 -2812  550 -2815 0

c  0-1 --> -1
c    (-b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧ -p_550) -> ( b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0)
c  in CNF:
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨  b^{1, 551}_2
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_1
c     b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨  b^{1, 551}_0
c  in DIMACS:
 2810  2811  2812  550  2813 0
 2810  2811  2812  550 -2814 0
 2810  2811  2812  550  2815 0

c  -1-1 --> -2
c    ( b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧  b^{1, 550}_0 ∧ -p_550) -> ( b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0)
c  in CNF:
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨  b^{1, 551}_2
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨  b^{1, 551}_1
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨  p_550 ∨ -b^{1, 551}_0
c  in DIMACS:
-2810  2811 -2812  550  2813 0
-2810  2811 -2812  550  2814 0
-2810  2811 -2812  550 -2815 0

c  -2-1 --> break 
c    ( b^{1, 550}_2 ∧  b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨  b^{1, 550}_0 ∨  p_550 ∨ break
c  in DIMACS:
-2810 -2811  2812  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 550}_2 ∧ -b^{1, 550}_1 ∧ -b^{1, 550}_0 ∧ true) 
c  in CNF:
c    -b^{1, 550}_2 ∨  b^{1, 550}_1 ∨  b^{1, 550}_0 ∨ false 
c  in DIMACS:
-2810  2811  2812  0

c  3 does not represent an automaton state.
c    -(-b^{1, 550}_2 ∧  b^{1, 550}_1 ∧  b^{1, 550}_0 ∧ true) 
c  in CNF:
c     b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ false 
c  in DIMACS:
 2810 -2811 -2812  0
c  -3 does not represent an automaton state.
c    -( b^{1, 550}_2 ∧  b^{1, 550}_1 ∧  b^{1, 550}_0 ∧ true) 
c  in CNF:
c    -b^{1, 550}_2 ∨ -b^{1, 550}_1 ∨ -b^{1, 550}_0 ∨ false 
c  in DIMACS:
-2810 -2811 -2812  0

c i = 551
c  -2+1 --> -1
c    ( b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧  p_551) -> ( b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0)
c  in CNF:
c    -b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨  b^{1, 552}_2
c    -b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_1
c    -b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨  b^{1, 552}_0
c  in DIMACS:
-2813 -2814  2815 -551  2816 0
-2813 -2814  2815 -551 -2817 0
-2813 -2814  2815 -551  2818 0

c  -1+1 --> 0
c    ( b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0 ∧  p_551) -> (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧ -b^{1, 552}_0)
c  in CNF:
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_2
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_1
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_0
c  in DIMACS:
-2813  2814 -2815 -551 -2816 0
-2813  2814 -2815 -551 -2817 0
-2813  2814 -2815 -551 -2818 0

c  0+1 --> 1
c    (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧  p_551) -> (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0)
c  in CNF:
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_2
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_1
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨  b^{1, 552}_0
c  in DIMACS:
 2813  2814  2815 -551 -2816 0
 2813  2814  2815 -551 -2817 0
 2813  2814  2815 -551  2818 0

c  1+1 --> 2
c    (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0 ∧  p_551) -> (-b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0)
c  in CNF:
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_2
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨  b^{1, 552}_1
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ -p_551 ∨ -b^{1, 552}_0
c  in DIMACS:
 2813  2814 -2815 -551 -2816 0
 2813  2814 -2815 -551  2817 0
 2813  2814 -2815 -551 -2818 0

c  2+1 --> break 
c    (-b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧  p_551) -> break
c  in CNF:
c     b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ -p_551 ∨ break
c  in DIMACS:
 2813 -2814  2815 -551 1162 0


c  2-1 --> 1
c    (-b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧ -p_551) -> (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0)
c  in CNF:
c     b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_2
c     b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_1
c     b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨  b^{1, 552}_0
c  in DIMACS:
 2813 -2814  2815  551 -2816 0
 2813 -2814  2815  551 -2817 0
 2813 -2814  2815  551  2818 0

c  1-1 --> 0
c    (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0 ∧ -p_551) -> (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧ -b^{1, 552}_0)
c  in CNF:
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_2
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_1
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_0
c  in DIMACS:
 2813  2814 -2815  551 -2816 0
 2813  2814 -2815  551 -2817 0
 2813  2814 -2815  551 -2818 0

c  0-1 --> -1
c    (-b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧ -p_551) -> ( b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0)
c  in CNF:
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨  b^{1, 552}_2
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_1
c     b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨  b^{1, 552}_0
c  in DIMACS:
 2813  2814  2815  551  2816 0
 2813  2814  2815  551 -2817 0
 2813  2814  2815  551  2818 0

c  -1-1 --> -2
c    ( b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧  b^{1, 551}_0 ∧ -p_551) -> ( b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0)
c  in CNF:
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨  b^{1, 552}_2
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨  b^{1, 552}_1
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨  p_551 ∨ -b^{1, 552}_0
c  in DIMACS:
-2813  2814 -2815  551  2816 0
-2813  2814 -2815  551  2817 0
-2813  2814 -2815  551 -2818 0

c  -2-1 --> break 
c    ( b^{1, 551}_2 ∧  b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧ -p_551) -> break
c  in CNF:
c    -b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨  b^{1, 551}_0 ∨  p_551 ∨ break
c  in DIMACS:
-2813 -2814  2815  551 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 551}_2 ∧ -b^{1, 551}_1 ∧ -b^{1, 551}_0 ∧ true) 
c  in CNF:
c    -b^{1, 551}_2 ∨  b^{1, 551}_1 ∨  b^{1, 551}_0 ∨ false 
c  in DIMACS:
-2813  2814  2815  0

c  3 does not represent an automaton state.
c    -(-b^{1, 551}_2 ∧  b^{1, 551}_1 ∧  b^{1, 551}_0 ∧ true) 
c  in CNF:
c     b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ false 
c  in DIMACS:
 2813 -2814 -2815  0
c  -3 does not represent an automaton state.
c    -( b^{1, 551}_2 ∧  b^{1, 551}_1 ∧  b^{1, 551}_0 ∧ true) 
c  in CNF:
c    -b^{1, 551}_2 ∨ -b^{1, 551}_1 ∨ -b^{1, 551}_0 ∨ false 
c  in DIMACS:
-2813 -2814 -2815  0

c i = 552
c  -2+1 --> -1
c    ( b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧  p_552) -> ( b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0)
c  in CNF:
c    -b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨  b^{1, 553}_2
c    -b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_1
c    -b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨  b^{1, 553}_0
c  in DIMACS:
-2816 -2817  2818 -552  2819 0
-2816 -2817  2818 -552 -2820 0
-2816 -2817  2818 -552  2821 0

c  -1+1 --> 0
c    ( b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0 ∧  p_552) -> (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧ -b^{1, 553}_0)
c  in CNF:
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_2
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_1
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_0
c  in DIMACS:
-2816  2817 -2818 -552 -2819 0
-2816  2817 -2818 -552 -2820 0
-2816  2817 -2818 -552 -2821 0

c  0+1 --> 1
c    (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧  p_552) -> (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0)
c  in CNF:
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_2
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_1
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨  b^{1, 553}_0
c  in DIMACS:
 2816  2817  2818 -552 -2819 0
 2816  2817  2818 -552 -2820 0
 2816  2817  2818 -552  2821 0

c  1+1 --> 2
c    (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0 ∧  p_552) -> (-b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0)
c  in CNF:
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_2
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨  b^{1, 553}_1
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ -p_552 ∨ -b^{1, 553}_0
c  in DIMACS:
 2816  2817 -2818 -552 -2819 0
 2816  2817 -2818 -552  2820 0
 2816  2817 -2818 -552 -2821 0

c  2+1 --> break 
c    (-b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧  p_552) -> break
c  in CNF:
c     b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 2816 -2817  2818 -552 1162 0


c  2-1 --> 1
c    (-b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧ -p_552) -> (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0)
c  in CNF:
c     b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_2
c     b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_1
c     b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨  b^{1, 553}_0
c  in DIMACS:
 2816 -2817  2818  552 -2819 0
 2816 -2817  2818  552 -2820 0
 2816 -2817  2818  552  2821 0

c  1-1 --> 0
c    (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0 ∧ -p_552) -> (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧ -b^{1, 553}_0)
c  in CNF:
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_2
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_1
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_0
c  in DIMACS:
 2816  2817 -2818  552 -2819 0
 2816  2817 -2818  552 -2820 0
 2816  2817 -2818  552 -2821 0

c  0-1 --> -1
c    (-b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧ -p_552) -> ( b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0)
c  in CNF:
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨  b^{1, 553}_2
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_1
c     b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨  b^{1, 553}_0
c  in DIMACS:
 2816  2817  2818  552  2819 0
 2816  2817  2818  552 -2820 0
 2816  2817  2818  552  2821 0

c  -1-1 --> -2
c    ( b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧  b^{1, 552}_0 ∧ -p_552) -> ( b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0)
c  in CNF:
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨  b^{1, 553}_2
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨  b^{1, 553}_1
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨  p_552 ∨ -b^{1, 553}_0
c  in DIMACS:
-2816  2817 -2818  552  2819 0
-2816  2817 -2818  552  2820 0
-2816  2817 -2818  552 -2821 0

c  -2-1 --> break 
c    ( b^{1, 552}_2 ∧  b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨  b^{1, 552}_0 ∨  p_552 ∨ break
c  in DIMACS:
-2816 -2817  2818  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 552}_2 ∧ -b^{1, 552}_1 ∧ -b^{1, 552}_0 ∧ true) 
c  in CNF:
c    -b^{1, 552}_2 ∨  b^{1, 552}_1 ∨  b^{1, 552}_0 ∨ false 
c  in DIMACS:
-2816  2817  2818  0

c  3 does not represent an automaton state.
c    -(-b^{1, 552}_2 ∧  b^{1, 552}_1 ∧  b^{1, 552}_0 ∧ true) 
c  in CNF:
c     b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ false 
c  in DIMACS:
 2816 -2817 -2818  0
c  -3 does not represent an automaton state.
c    -( b^{1, 552}_2 ∧  b^{1, 552}_1 ∧  b^{1, 552}_0 ∧ true) 
c  in CNF:
c    -b^{1, 552}_2 ∨ -b^{1, 552}_1 ∨ -b^{1, 552}_0 ∨ false 
c  in DIMACS:
-2816 -2817 -2818  0

c i = 553
c  -2+1 --> -1
c    ( b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧  p_553) -> ( b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0)
c  in CNF:
c    -b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨  b^{1, 554}_2
c    -b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_1
c    -b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨  b^{1, 554}_0
c  in DIMACS:
-2819 -2820  2821 -553  2822 0
-2819 -2820  2821 -553 -2823 0
-2819 -2820  2821 -553  2824 0

c  -1+1 --> 0
c    ( b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0 ∧  p_553) -> (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧ -b^{1, 554}_0)
c  in CNF:
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_2
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_1
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_0
c  in DIMACS:
-2819  2820 -2821 -553 -2822 0
-2819  2820 -2821 -553 -2823 0
-2819  2820 -2821 -553 -2824 0

c  0+1 --> 1
c    (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧  p_553) -> (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0)
c  in CNF:
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_2
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_1
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨  b^{1, 554}_0
c  in DIMACS:
 2819  2820  2821 -553 -2822 0
 2819  2820  2821 -553 -2823 0
 2819  2820  2821 -553  2824 0

c  1+1 --> 2
c    (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0 ∧  p_553) -> (-b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0)
c  in CNF:
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_2
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨  b^{1, 554}_1
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ -p_553 ∨ -b^{1, 554}_0
c  in DIMACS:
 2819  2820 -2821 -553 -2822 0
 2819  2820 -2821 -553  2823 0
 2819  2820 -2821 -553 -2824 0

c  2+1 --> break 
c    (-b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧  p_553) -> break
c  in CNF:
c     b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ -p_553 ∨ break
c  in DIMACS:
 2819 -2820  2821 -553 1162 0


c  2-1 --> 1
c    (-b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧ -p_553) -> (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0)
c  in CNF:
c     b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_2
c     b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_1
c     b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨  b^{1, 554}_0
c  in DIMACS:
 2819 -2820  2821  553 -2822 0
 2819 -2820  2821  553 -2823 0
 2819 -2820  2821  553  2824 0

c  1-1 --> 0
c    (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0 ∧ -p_553) -> (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧ -b^{1, 554}_0)
c  in CNF:
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_2
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_1
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_0
c  in DIMACS:
 2819  2820 -2821  553 -2822 0
 2819  2820 -2821  553 -2823 0
 2819  2820 -2821  553 -2824 0

c  0-1 --> -1
c    (-b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧ -p_553) -> ( b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0)
c  in CNF:
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨  b^{1, 554}_2
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_1
c     b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨  b^{1, 554}_0
c  in DIMACS:
 2819  2820  2821  553  2822 0
 2819  2820  2821  553 -2823 0
 2819  2820  2821  553  2824 0

c  -1-1 --> -2
c    ( b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧  b^{1, 553}_0 ∧ -p_553) -> ( b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0)
c  in CNF:
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨  b^{1, 554}_2
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨  b^{1, 554}_1
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨  p_553 ∨ -b^{1, 554}_0
c  in DIMACS:
-2819  2820 -2821  553  2822 0
-2819  2820 -2821  553  2823 0
-2819  2820 -2821  553 -2824 0

c  -2-1 --> break 
c    ( b^{1, 553}_2 ∧  b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧ -p_553) -> break
c  in CNF:
c    -b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨  b^{1, 553}_0 ∨  p_553 ∨ break
c  in DIMACS:
-2819 -2820  2821  553 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 553}_2 ∧ -b^{1, 553}_1 ∧ -b^{1, 553}_0 ∧ true) 
c  in CNF:
c    -b^{1, 553}_2 ∨  b^{1, 553}_1 ∨  b^{1, 553}_0 ∨ false 
c  in DIMACS:
-2819  2820  2821  0

c  3 does not represent an automaton state.
c    -(-b^{1, 553}_2 ∧  b^{1, 553}_1 ∧  b^{1, 553}_0 ∧ true) 
c  in CNF:
c     b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ false 
c  in DIMACS:
 2819 -2820 -2821  0
c  -3 does not represent an automaton state.
c    -( b^{1, 553}_2 ∧  b^{1, 553}_1 ∧  b^{1, 553}_0 ∧ true) 
c  in CNF:
c    -b^{1, 553}_2 ∨ -b^{1, 553}_1 ∨ -b^{1, 553}_0 ∨ false 
c  in DIMACS:
-2819 -2820 -2821  0

c i = 554
c  -2+1 --> -1
c    ( b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧  p_554) -> ( b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0)
c  in CNF:
c    -b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨  b^{1, 555}_2
c    -b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_1
c    -b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨  b^{1, 555}_0
c  in DIMACS:
-2822 -2823  2824 -554  2825 0
-2822 -2823  2824 -554 -2826 0
-2822 -2823  2824 -554  2827 0

c  -1+1 --> 0
c    ( b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0 ∧  p_554) -> (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧ -b^{1, 555}_0)
c  in CNF:
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_2
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_1
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_0
c  in DIMACS:
-2822  2823 -2824 -554 -2825 0
-2822  2823 -2824 -554 -2826 0
-2822  2823 -2824 -554 -2827 0

c  0+1 --> 1
c    (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧  p_554) -> (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0)
c  in CNF:
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_2
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_1
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨  b^{1, 555}_0
c  in DIMACS:
 2822  2823  2824 -554 -2825 0
 2822  2823  2824 -554 -2826 0
 2822  2823  2824 -554  2827 0

c  1+1 --> 2
c    (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0 ∧  p_554) -> (-b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0)
c  in CNF:
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_2
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨  b^{1, 555}_1
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ -p_554 ∨ -b^{1, 555}_0
c  in DIMACS:
 2822  2823 -2824 -554 -2825 0
 2822  2823 -2824 -554  2826 0
 2822  2823 -2824 -554 -2827 0

c  2+1 --> break 
c    (-b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧  p_554) -> break
c  in CNF:
c     b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ -p_554 ∨ break
c  in DIMACS:
 2822 -2823  2824 -554 1162 0


c  2-1 --> 1
c    (-b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧ -p_554) -> (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0)
c  in CNF:
c     b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_2
c     b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_1
c     b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨  b^{1, 555}_0
c  in DIMACS:
 2822 -2823  2824  554 -2825 0
 2822 -2823  2824  554 -2826 0
 2822 -2823  2824  554  2827 0

c  1-1 --> 0
c    (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0 ∧ -p_554) -> (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧ -b^{1, 555}_0)
c  in CNF:
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_2
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_1
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_0
c  in DIMACS:
 2822  2823 -2824  554 -2825 0
 2822  2823 -2824  554 -2826 0
 2822  2823 -2824  554 -2827 0

c  0-1 --> -1
c    (-b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧ -p_554) -> ( b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0)
c  in CNF:
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨  b^{1, 555}_2
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_1
c     b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨  b^{1, 555}_0
c  in DIMACS:
 2822  2823  2824  554  2825 0
 2822  2823  2824  554 -2826 0
 2822  2823  2824  554  2827 0

c  -1-1 --> -2
c    ( b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧  b^{1, 554}_0 ∧ -p_554) -> ( b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0)
c  in CNF:
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨  b^{1, 555}_2
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨  b^{1, 555}_1
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨  p_554 ∨ -b^{1, 555}_0
c  in DIMACS:
-2822  2823 -2824  554  2825 0
-2822  2823 -2824  554  2826 0
-2822  2823 -2824  554 -2827 0

c  -2-1 --> break 
c    ( b^{1, 554}_2 ∧  b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧ -p_554) -> break
c  in CNF:
c    -b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨  b^{1, 554}_0 ∨  p_554 ∨ break
c  in DIMACS:
-2822 -2823  2824  554 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 554}_2 ∧ -b^{1, 554}_1 ∧ -b^{1, 554}_0 ∧ true) 
c  in CNF:
c    -b^{1, 554}_2 ∨  b^{1, 554}_1 ∨  b^{1, 554}_0 ∨ false 
c  in DIMACS:
-2822  2823  2824  0

c  3 does not represent an automaton state.
c    -(-b^{1, 554}_2 ∧  b^{1, 554}_1 ∧  b^{1, 554}_0 ∧ true) 
c  in CNF:
c     b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ false 
c  in DIMACS:
 2822 -2823 -2824  0
c  -3 does not represent an automaton state.
c    -( b^{1, 554}_2 ∧  b^{1, 554}_1 ∧  b^{1, 554}_0 ∧ true) 
c  in CNF:
c    -b^{1, 554}_2 ∨ -b^{1, 554}_1 ∨ -b^{1, 554}_0 ∨ false 
c  in DIMACS:
-2822 -2823 -2824  0

c i = 555
c  -2+1 --> -1
c    ( b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧  p_555) -> ( b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0)
c  in CNF:
c    -b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨  b^{1, 556}_2
c    -b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_1
c    -b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨  b^{1, 556}_0
c  in DIMACS:
-2825 -2826  2827 -555  2828 0
-2825 -2826  2827 -555 -2829 0
-2825 -2826  2827 -555  2830 0

c  -1+1 --> 0
c    ( b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0 ∧  p_555) -> (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧ -b^{1, 556}_0)
c  in CNF:
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_2
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_1
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_0
c  in DIMACS:
-2825  2826 -2827 -555 -2828 0
-2825  2826 -2827 -555 -2829 0
-2825  2826 -2827 -555 -2830 0

c  0+1 --> 1
c    (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧  p_555) -> (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0)
c  in CNF:
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_2
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_1
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨  b^{1, 556}_0
c  in DIMACS:
 2825  2826  2827 -555 -2828 0
 2825  2826  2827 -555 -2829 0
 2825  2826  2827 -555  2830 0

c  1+1 --> 2
c    (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0 ∧  p_555) -> (-b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0)
c  in CNF:
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_2
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨  b^{1, 556}_1
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ -p_555 ∨ -b^{1, 556}_0
c  in DIMACS:
 2825  2826 -2827 -555 -2828 0
 2825  2826 -2827 -555  2829 0
 2825  2826 -2827 -555 -2830 0

c  2+1 --> break 
c    (-b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧  p_555) -> break
c  in CNF:
c     b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 2825 -2826  2827 -555 1162 0


c  2-1 --> 1
c    (-b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧ -p_555) -> (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0)
c  in CNF:
c     b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_2
c     b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_1
c     b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨  b^{1, 556}_0
c  in DIMACS:
 2825 -2826  2827  555 -2828 0
 2825 -2826  2827  555 -2829 0
 2825 -2826  2827  555  2830 0

c  1-1 --> 0
c    (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0 ∧ -p_555) -> (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧ -b^{1, 556}_0)
c  in CNF:
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_2
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_1
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_0
c  in DIMACS:
 2825  2826 -2827  555 -2828 0
 2825  2826 -2827  555 -2829 0
 2825  2826 -2827  555 -2830 0

c  0-1 --> -1
c    (-b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧ -p_555) -> ( b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0)
c  in CNF:
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨  b^{1, 556}_2
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_1
c     b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨  b^{1, 556}_0
c  in DIMACS:
 2825  2826  2827  555  2828 0
 2825  2826  2827  555 -2829 0
 2825  2826  2827  555  2830 0

c  -1-1 --> -2
c    ( b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧  b^{1, 555}_0 ∧ -p_555) -> ( b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0)
c  in CNF:
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨  b^{1, 556}_2
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨  b^{1, 556}_1
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨  p_555 ∨ -b^{1, 556}_0
c  in DIMACS:
-2825  2826 -2827  555  2828 0
-2825  2826 -2827  555  2829 0
-2825  2826 -2827  555 -2830 0

c  -2-1 --> break 
c    ( b^{1, 555}_2 ∧  b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨  b^{1, 555}_0 ∨  p_555 ∨ break
c  in DIMACS:
-2825 -2826  2827  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 555}_2 ∧ -b^{1, 555}_1 ∧ -b^{1, 555}_0 ∧ true) 
c  in CNF:
c    -b^{1, 555}_2 ∨  b^{1, 555}_1 ∨  b^{1, 555}_0 ∨ false 
c  in DIMACS:
-2825  2826  2827  0

c  3 does not represent an automaton state.
c    -(-b^{1, 555}_2 ∧  b^{1, 555}_1 ∧  b^{1, 555}_0 ∧ true) 
c  in CNF:
c     b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ false 
c  in DIMACS:
 2825 -2826 -2827  0
c  -3 does not represent an automaton state.
c    -( b^{1, 555}_2 ∧  b^{1, 555}_1 ∧  b^{1, 555}_0 ∧ true) 
c  in CNF:
c    -b^{1, 555}_2 ∨ -b^{1, 555}_1 ∨ -b^{1, 555}_0 ∨ false 
c  in DIMACS:
-2825 -2826 -2827  0

c i = 556
c  -2+1 --> -1
c    ( b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧  p_556) -> ( b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0)
c  in CNF:
c    -b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨  b^{1, 557}_2
c    -b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_1
c    -b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨  b^{1, 557}_0
c  in DIMACS:
-2828 -2829  2830 -556  2831 0
-2828 -2829  2830 -556 -2832 0
-2828 -2829  2830 -556  2833 0

c  -1+1 --> 0
c    ( b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0 ∧  p_556) -> (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧ -b^{1, 557}_0)
c  in CNF:
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_2
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_1
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_0
c  in DIMACS:
-2828  2829 -2830 -556 -2831 0
-2828  2829 -2830 -556 -2832 0
-2828  2829 -2830 -556 -2833 0

c  0+1 --> 1
c    (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧  p_556) -> (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0)
c  in CNF:
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_2
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_1
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨  b^{1, 557}_0
c  in DIMACS:
 2828  2829  2830 -556 -2831 0
 2828  2829  2830 -556 -2832 0
 2828  2829  2830 -556  2833 0

c  1+1 --> 2
c    (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0 ∧  p_556) -> (-b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0)
c  in CNF:
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_2
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨  b^{1, 557}_1
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ -p_556 ∨ -b^{1, 557}_0
c  in DIMACS:
 2828  2829 -2830 -556 -2831 0
 2828  2829 -2830 -556  2832 0
 2828  2829 -2830 -556 -2833 0

c  2+1 --> break 
c    (-b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧  p_556) -> break
c  in CNF:
c     b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ -p_556 ∨ break
c  in DIMACS:
 2828 -2829  2830 -556 1162 0


c  2-1 --> 1
c    (-b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧ -p_556) -> (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0)
c  in CNF:
c     b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_2
c     b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_1
c     b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨  b^{1, 557}_0
c  in DIMACS:
 2828 -2829  2830  556 -2831 0
 2828 -2829  2830  556 -2832 0
 2828 -2829  2830  556  2833 0

c  1-1 --> 0
c    (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0 ∧ -p_556) -> (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧ -b^{1, 557}_0)
c  in CNF:
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_2
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_1
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_0
c  in DIMACS:
 2828  2829 -2830  556 -2831 0
 2828  2829 -2830  556 -2832 0
 2828  2829 -2830  556 -2833 0

c  0-1 --> -1
c    (-b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧ -p_556) -> ( b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0)
c  in CNF:
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨  b^{1, 557}_2
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_1
c     b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨  b^{1, 557}_0
c  in DIMACS:
 2828  2829  2830  556  2831 0
 2828  2829  2830  556 -2832 0
 2828  2829  2830  556  2833 0

c  -1-1 --> -2
c    ( b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧  b^{1, 556}_0 ∧ -p_556) -> ( b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0)
c  in CNF:
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨  b^{1, 557}_2
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨  b^{1, 557}_1
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨  p_556 ∨ -b^{1, 557}_0
c  in DIMACS:
-2828  2829 -2830  556  2831 0
-2828  2829 -2830  556  2832 0
-2828  2829 -2830  556 -2833 0

c  -2-1 --> break 
c    ( b^{1, 556}_2 ∧  b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧ -p_556) -> break
c  in CNF:
c    -b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨  b^{1, 556}_0 ∨  p_556 ∨ break
c  in DIMACS:
-2828 -2829  2830  556 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 556}_2 ∧ -b^{1, 556}_1 ∧ -b^{1, 556}_0 ∧ true) 
c  in CNF:
c    -b^{1, 556}_2 ∨  b^{1, 556}_1 ∨  b^{1, 556}_0 ∨ false 
c  in DIMACS:
-2828  2829  2830  0

c  3 does not represent an automaton state.
c    -(-b^{1, 556}_2 ∧  b^{1, 556}_1 ∧  b^{1, 556}_0 ∧ true) 
c  in CNF:
c     b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ false 
c  in DIMACS:
 2828 -2829 -2830  0
c  -3 does not represent an automaton state.
c    -( b^{1, 556}_2 ∧  b^{1, 556}_1 ∧  b^{1, 556}_0 ∧ true) 
c  in CNF:
c    -b^{1, 556}_2 ∨ -b^{1, 556}_1 ∨ -b^{1, 556}_0 ∨ false 
c  in DIMACS:
-2828 -2829 -2830  0

c i = 557
c  -2+1 --> -1
c    ( b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧  p_557) -> ( b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0)
c  in CNF:
c    -b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨  b^{1, 558}_2
c    -b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_1
c    -b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨  b^{1, 558}_0
c  in DIMACS:
-2831 -2832  2833 -557  2834 0
-2831 -2832  2833 -557 -2835 0
-2831 -2832  2833 -557  2836 0

c  -1+1 --> 0
c    ( b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0 ∧  p_557) -> (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧ -b^{1, 558}_0)
c  in CNF:
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_2
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_1
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_0
c  in DIMACS:
-2831  2832 -2833 -557 -2834 0
-2831  2832 -2833 -557 -2835 0
-2831  2832 -2833 -557 -2836 0

c  0+1 --> 1
c    (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧  p_557) -> (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0)
c  in CNF:
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_2
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_1
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨  b^{1, 558}_0
c  in DIMACS:
 2831  2832  2833 -557 -2834 0
 2831  2832  2833 -557 -2835 0
 2831  2832  2833 -557  2836 0

c  1+1 --> 2
c    (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0 ∧  p_557) -> (-b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0)
c  in CNF:
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_2
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨  b^{1, 558}_1
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ -p_557 ∨ -b^{1, 558}_0
c  in DIMACS:
 2831  2832 -2833 -557 -2834 0
 2831  2832 -2833 -557  2835 0
 2831  2832 -2833 -557 -2836 0

c  2+1 --> break 
c    (-b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧  p_557) -> break
c  in CNF:
c     b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ -p_557 ∨ break
c  in DIMACS:
 2831 -2832  2833 -557 1162 0


c  2-1 --> 1
c    (-b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧ -p_557) -> (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0)
c  in CNF:
c     b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_2
c     b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_1
c     b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨  b^{1, 558}_0
c  in DIMACS:
 2831 -2832  2833  557 -2834 0
 2831 -2832  2833  557 -2835 0
 2831 -2832  2833  557  2836 0

c  1-1 --> 0
c    (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0 ∧ -p_557) -> (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧ -b^{1, 558}_0)
c  in CNF:
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_2
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_1
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_0
c  in DIMACS:
 2831  2832 -2833  557 -2834 0
 2831  2832 -2833  557 -2835 0
 2831  2832 -2833  557 -2836 0

c  0-1 --> -1
c    (-b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧ -p_557) -> ( b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0)
c  in CNF:
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨  b^{1, 558}_2
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_1
c     b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨  b^{1, 558}_0
c  in DIMACS:
 2831  2832  2833  557  2834 0
 2831  2832  2833  557 -2835 0
 2831  2832  2833  557  2836 0

c  -1-1 --> -2
c    ( b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧  b^{1, 557}_0 ∧ -p_557) -> ( b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0)
c  in CNF:
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨  b^{1, 558}_2
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨  b^{1, 558}_1
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨  p_557 ∨ -b^{1, 558}_0
c  in DIMACS:
-2831  2832 -2833  557  2834 0
-2831  2832 -2833  557  2835 0
-2831  2832 -2833  557 -2836 0

c  -2-1 --> break 
c    ( b^{1, 557}_2 ∧  b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧ -p_557) -> break
c  in CNF:
c    -b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨  b^{1, 557}_0 ∨  p_557 ∨ break
c  in DIMACS:
-2831 -2832  2833  557 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 557}_2 ∧ -b^{1, 557}_1 ∧ -b^{1, 557}_0 ∧ true) 
c  in CNF:
c    -b^{1, 557}_2 ∨  b^{1, 557}_1 ∨  b^{1, 557}_0 ∨ false 
c  in DIMACS:
-2831  2832  2833  0

c  3 does not represent an automaton state.
c    -(-b^{1, 557}_2 ∧  b^{1, 557}_1 ∧  b^{1, 557}_0 ∧ true) 
c  in CNF:
c     b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ false 
c  in DIMACS:
 2831 -2832 -2833  0
c  -3 does not represent an automaton state.
c    -( b^{1, 557}_2 ∧  b^{1, 557}_1 ∧  b^{1, 557}_0 ∧ true) 
c  in CNF:
c    -b^{1, 557}_2 ∨ -b^{1, 557}_1 ∨ -b^{1, 557}_0 ∨ false 
c  in DIMACS:
-2831 -2832 -2833  0

c i = 558
c  -2+1 --> -1
c    ( b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧  p_558) -> ( b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0)
c  in CNF:
c    -b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨  b^{1, 559}_2
c    -b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_1
c    -b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨  b^{1, 559}_0
c  in DIMACS:
-2834 -2835  2836 -558  2837 0
-2834 -2835  2836 -558 -2838 0
-2834 -2835  2836 -558  2839 0

c  -1+1 --> 0
c    ( b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0 ∧  p_558) -> (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧ -b^{1, 559}_0)
c  in CNF:
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_2
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_1
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_0
c  in DIMACS:
-2834  2835 -2836 -558 -2837 0
-2834  2835 -2836 -558 -2838 0
-2834  2835 -2836 -558 -2839 0

c  0+1 --> 1
c    (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧  p_558) -> (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0)
c  in CNF:
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_2
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_1
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨  b^{1, 559}_0
c  in DIMACS:
 2834  2835  2836 -558 -2837 0
 2834  2835  2836 -558 -2838 0
 2834  2835  2836 -558  2839 0

c  1+1 --> 2
c    (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0 ∧  p_558) -> (-b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0)
c  in CNF:
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_2
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨  b^{1, 559}_1
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ -p_558 ∨ -b^{1, 559}_0
c  in DIMACS:
 2834  2835 -2836 -558 -2837 0
 2834  2835 -2836 -558  2838 0
 2834  2835 -2836 -558 -2839 0

c  2+1 --> break 
c    (-b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧  p_558) -> break
c  in CNF:
c     b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 2834 -2835  2836 -558 1162 0


c  2-1 --> 1
c    (-b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧ -p_558) -> (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0)
c  in CNF:
c     b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_2
c     b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_1
c     b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨  b^{1, 559}_0
c  in DIMACS:
 2834 -2835  2836  558 -2837 0
 2834 -2835  2836  558 -2838 0
 2834 -2835  2836  558  2839 0

c  1-1 --> 0
c    (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0 ∧ -p_558) -> (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧ -b^{1, 559}_0)
c  in CNF:
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_2
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_1
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_0
c  in DIMACS:
 2834  2835 -2836  558 -2837 0
 2834  2835 -2836  558 -2838 0
 2834  2835 -2836  558 -2839 0

c  0-1 --> -1
c    (-b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧ -p_558) -> ( b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0)
c  in CNF:
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨  b^{1, 559}_2
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_1
c     b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨  b^{1, 559}_0
c  in DIMACS:
 2834  2835  2836  558  2837 0
 2834  2835  2836  558 -2838 0
 2834  2835  2836  558  2839 0

c  -1-1 --> -2
c    ( b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧  b^{1, 558}_0 ∧ -p_558) -> ( b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0)
c  in CNF:
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨  b^{1, 559}_2
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨  b^{1, 559}_1
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨  p_558 ∨ -b^{1, 559}_0
c  in DIMACS:
-2834  2835 -2836  558  2837 0
-2834  2835 -2836  558  2838 0
-2834  2835 -2836  558 -2839 0

c  -2-1 --> break 
c    ( b^{1, 558}_2 ∧  b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨  b^{1, 558}_0 ∨  p_558 ∨ break
c  in DIMACS:
-2834 -2835  2836  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 558}_2 ∧ -b^{1, 558}_1 ∧ -b^{1, 558}_0 ∧ true) 
c  in CNF:
c    -b^{1, 558}_2 ∨  b^{1, 558}_1 ∨  b^{1, 558}_0 ∨ false 
c  in DIMACS:
-2834  2835  2836  0

c  3 does not represent an automaton state.
c    -(-b^{1, 558}_2 ∧  b^{1, 558}_1 ∧  b^{1, 558}_0 ∧ true) 
c  in CNF:
c     b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ false 
c  in DIMACS:
 2834 -2835 -2836  0
c  -3 does not represent an automaton state.
c    -( b^{1, 558}_2 ∧  b^{1, 558}_1 ∧  b^{1, 558}_0 ∧ true) 
c  in CNF:
c    -b^{1, 558}_2 ∨ -b^{1, 558}_1 ∨ -b^{1, 558}_0 ∨ false 
c  in DIMACS:
-2834 -2835 -2836  0

c i = 559
c  -2+1 --> -1
c    ( b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧  p_559) -> ( b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0)
c  in CNF:
c    -b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨  b^{1, 560}_2
c    -b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_1
c    -b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨  b^{1, 560}_0
c  in DIMACS:
-2837 -2838  2839 -559  2840 0
-2837 -2838  2839 -559 -2841 0
-2837 -2838  2839 -559  2842 0

c  -1+1 --> 0
c    ( b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0 ∧  p_559) -> (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧ -b^{1, 560}_0)
c  in CNF:
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_2
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_1
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_0
c  in DIMACS:
-2837  2838 -2839 -559 -2840 0
-2837  2838 -2839 -559 -2841 0
-2837  2838 -2839 -559 -2842 0

c  0+1 --> 1
c    (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧  p_559) -> (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0)
c  in CNF:
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_2
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_1
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨  b^{1, 560}_0
c  in DIMACS:
 2837  2838  2839 -559 -2840 0
 2837  2838  2839 -559 -2841 0
 2837  2838  2839 -559  2842 0

c  1+1 --> 2
c    (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0 ∧  p_559) -> (-b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0)
c  in CNF:
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_2
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨  b^{1, 560}_1
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ -p_559 ∨ -b^{1, 560}_0
c  in DIMACS:
 2837  2838 -2839 -559 -2840 0
 2837  2838 -2839 -559  2841 0
 2837  2838 -2839 -559 -2842 0

c  2+1 --> break 
c    (-b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧  p_559) -> break
c  in CNF:
c     b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ -p_559 ∨ break
c  in DIMACS:
 2837 -2838  2839 -559 1162 0


c  2-1 --> 1
c    (-b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧ -p_559) -> (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0)
c  in CNF:
c     b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_2
c     b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_1
c     b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨  b^{1, 560}_0
c  in DIMACS:
 2837 -2838  2839  559 -2840 0
 2837 -2838  2839  559 -2841 0
 2837 -2838  2839  559  2842 0

c  1-1 --> 0
c    (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0 ∧ -p_559) -> (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧ -b^{1, 560}_0)
c  in CNF:
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_2
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_1
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_0
c  in DIMACS:
 2837  2838 -2839  559 -2840 0
 2837  2838 -2839  559 -2841 0
 2837  2838 -2839  559 -2842 0

c  0-1 --> -1
c    (-b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧ -p_559) -> ( b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0)
c  in CNF:
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨  b^{1, 560}_2
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_1
c     b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨  b^{1, 560}_0
c  in DIMACS:
 2837  2838  2839  559  2840 0
 2837  2838  2839  559 -2841 0
 2837  2838  2839  559  2842 0

c  -1-1 --> -2
c    ( b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧  b^{1, 559}_0 ∧ -p_559) -> ( b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0)
c  in CNF:
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨  b^{1, 560}_2
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨  b^{1, 560}_1
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨  p_559 ∨ -b^{1, 560}_0
c  in DIMACS:
-2837  2838 -2839  559  2840 0
-2837  2838 -2839  559  2841 0
-2837  2838 -2839  559 -2842 0

c  -2-1 --> break 
c    ( b^{1, 559}_2 ∧  b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧ -p_559) -> break
c  in CNF:
c    -b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨  b^{1, 559}_0 ∨  p_559 ∨ break
c  in DIMACS:
-2837 -2838  2839  559 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 559}_2 ∧ -b^{1, 559}_1 ∧ -b^{1, 559}_0 ∧ true) 
c  in CNF:
c    -b^{1, 559}_2 ∨  b^{1, 559}_1 ∨  b^{1, 559}_0 ∨ false 
c  in DIMACS:
-2837  2838  2839  0

c  3 does not represent an automaton state.
c    -(-b^{1, 559}_2 ∧  b^{1, 559}_1 ∧  b^{1, 559}_0 ∧ true) 
c  in CNF:
c     b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ false 
c  in DIMACS:
 2837 -2838 -2839  0
c  -3 does not represent an automaton state.
c    -( b^{1, 559}_2 ∧  b^{1, 559}_1 ∧  b^{1, 559}_0 ∧ true) 
c  in CNF:
c    -b^{1, 559}_2 ∨ -b^{1, 559}_1 ∨ -b^{1, 559}_0 ∨ false 
c  in DIMACS:
-2837 -2838 -2839  0

c i = 560
c  -2+1 --> -1
c    ( b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧  p_560) -> ( b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0)
c  in CNF:
c    -b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨  b^{1, 561}_2
c    -b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_1
c    -b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨  b^{1, 561}_0
c  in DIMACS:
-2840 -2841  2842 -560  2843 0
-2840 -2841  2842 -560 -2844 0
-2840 -2841  2842 -560  2845 0

c  -1+1 --> 0
c    ( b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0 ∧  p_560) -> (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧ -b^{1, 561}_0)
c  in CNF:
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_2
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_1
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_0
c  in DIMACS:
-2840  2841 -2842 -560 -2843 0
-2840  2841 -2842 -560 -2844 0
-2840  2841 -2842 -560 -2845 0

c  0+1 --> 1
c    (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧  p_560) -> (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0)
c  in CNF:
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_2
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_1
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨  b^{1, 561}_0
c  in DIMACS:
 2840  2841  2842 -560 -2843 0
 2840  2841  2842 -560 -2844 0
 2840  2841  2842 -560  2845 0

c  1+1 --> 2
c    (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0 ∧  p_560) -> (-b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0)
c  in CNF:
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_2
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨  b^{1, 561}_1
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ -p_560 ∨ -b^{1, 561}_0
c  in DIMACS:
 2840  2841 -2842 -560 -2843 0
 2840  2841 -2842 -560  2844 0
 2840  2841 -2842 -560 -2845 0

c  2+1 --> break 
c    (-b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧  p_560) -> break
c  in CNF:
c     b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 2840 -2841  2842 -560 1162 0


c  2-1 --> 1
c    (-b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧ -p_560) -> (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0)
c  in CNF:
c     b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_2
c     b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_1
c     b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨  b^{1, 561}_0
c  in DIMACS:
 2840 -2841  2842  560 -2843 0
 2840 -2841  2842  560 -2844 0
 2840 -2841  2842  560  2845 0

c  1-1 --> 0
c    (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0 ∧ -p_560) -> (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧ -b^{1, 561}_0)
c  in CNF:
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_2
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_1
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_0
c  in DIMACS:
 2840  2841 -2842  560 -2843 0
 2840  2841 -2842  560 -2844 0
 2840  2841 -2842  560 -2845 0

c  0-1 --> -1
c    (-b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧ -p_560) -> ( b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0)
c  in CNF:
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨  b^{1, 561}_2
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_1
c     b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨  b^{1, 561}_0
c  in DIMACS:
 2840  2841  2842  560  2843 0
 2840  2841  2842  560 -2844 0
 2840  2841  2842  560  2845 0

c  -1-1 --> -2
c    ( b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧  b^{1, 560}_0 ∧ -p_560) -> ( b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0)
c  in CNF:
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨  b^{1, 561}_2
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨  b^{1, 561}_1
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨  p_560 ∨ -b^{1, 561}_0
c  in DIMACS:
-2840  2841 -2842  560  2843 0
-2840  2841 -2842  560  2844 0
-2840  2841 -2842  560 -2845 0

c  -2-1 --> break 
c    ( b^{1, 560}_2 ∧  b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨  b^{1, 560}_0 ∨  p_560 ∨ break
c  in DIMACS:
-2840 -2841  2842  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 560}_2 ∧ -b^{1, 560}_1 ∧ -b^{1, 560}_0 ∧ true) 
c  in CNF:
c    -b^{1, 560}_2 ∨  b^{1, 560}_1 ∨  b^{1, 560}_0 ∨ false 
c  in DIMACS:
-2840  2841  2842  0

c  3 does not represent an automaton state.
c    -(-b^{1, 560}_2 ∧  b^{1, 560}_1 ∧  b^{1, 560}_0 ∧ true) 
c  in CNF:
c     b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ false 
c  in DIMACS:
 2840 -2841 -2842  0
c  -3 does not represent an automaton state.
c    -( b^{1, 560}_2 ∧  b^{1, 560}_1 ∧  b^{1, 560}_0 ∧ true) 
c  in CNF:
c    -b^{1, 560}_2 ∨ -b^{1, 560}_1 ∨ -b^{1, 560}_0 ∨ false 
c  in DIMACS:
-2840 -2841 -2842  0

c i = 561
c  -2+1 --> -1
c    ( b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧  p_561) -> ( b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0)
c  in CNF:
c    -b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨  b^{1, 562}_2
c    -b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_1
c    -b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨  b^{1, 562}_0
c  in DIMACS:
-2843 -2844  2845 -561  2846 0
-2843 -2844  2845 -561 -2847 0
-2843 -2844  2845 -561  2848 0

c  -1+1 --> 0
c    ( b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0 ∧  p_561) -> (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧ -b^{1, 562}_0)
c  in CNF:
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_2
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_1
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_0
c  in DIMACS:
-2843  2844 -2845 -561 -2846 0
-2843  2844 -2845 -561 -2847 0
-2843  2844 -2845 -561 -2848 0

c  0+1 --> 1
c    (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧  p_561) -> (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0)
c  in CNF:
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_2
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_1
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨  b^{1, 562}_0
c  in DIMACS:
 2843  2844  2845 -561 -2846 0
 2843  2844  2845 -561 -2847 0
 2843  2844  2845 -561  2848 0

c  1+1 --> 2
c    (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0 ∧  p_561) -> (-b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0)
c  in CNF:
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_2
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨  b^{1, 562}_1
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ -p_561 ∨ -b^{1, 562}_0
c  in DIMACS:
 2843  2844 -2845 -561 -2846 0
 2843  2844 -2845 -561  2847 0
 2843  2844 -2845 -561 -2848 0

c  2+1 --> break 
c    (-b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧  p_561) -> break
c  in CNF:
c     b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 2843 -2844  2845 -561 1162 0


c  2-1 --> 1
c    (-b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧ -p_561) -> (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0)
c  in CNF:
c     b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_2
c     b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_1
c     b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨  b^{1, 562}_0
c  in DIMACS:
 2843 -2844  2845  561 -2846 0
 2843 -2844  2845  561 -2847 0
 2843 -2844  2845  561  2848 0

c  1-1 --> 0
c    (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0 ∧ -p_561) -> (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧ -b^{1, 562}_0)
c  in CNF:
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_2
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_1
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_0
c  in DIMACS:
 2843  2844 -2845  561 -2846 0
 2843  2844 -2845  561 -2847 0
 2843  2844 -2845  561 -2848 0

c  0-1 --> -1
c    (-b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧ -p_561) -> ( b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0)
c  in CNF:
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨  b^{1, 562}_2
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_1
c     b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨  b^{1, 562}_0
c  in DIMACS:
 2843  2844  2845  561  2846 0
 2843  2844  2845  561 -2847 0
 2843  2844  2845  561  2848 0

c  -1-1 --> -2
c    ( b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧  b^{1, 561}_0 ∧ -p_561) -> ( b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0)
c  in CNF:
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨  b^{1, 562}_2
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨  b^{1, 562}_1
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨  p_561 ∨ -b^{1, 562}_0
c  in DIMACS:
-2843  2844 -2845  561  2846 0
-2843  2844 -2845  561  2847 0
-2843  2844 -2845  561 -2848 0

c  -2-1 --> break 
c    ( b^{1, 561}_2 ∧  b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨  b^{1, 561}_0 ∨  p_561 ∨ break
c  in DIMACS:
-2843 -2844  2845  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 561}_2 ∧ -b^{1, 561}_1 ∧ -b^{1, 561}_0 ∧ true) 
c  in CNF:
c    -b^{1, 561}_2 ∨  b^{1, 561}_1 ∨  b^{1, 561}_0 ∨ false 
c  in DIMACS:
-2843  2844  2845  0

c  3 does not represent an automaton state.
c    -(-b^{1, 561}_2 ∧  b^{1, 561}_1 ∧  b^{1, 561}_0 ∧ true) 
c  in CNF:
c     b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ false 
c  in DIMACS:
 2843 -2844 -2845  0
c  -3 does not represent an automaton state.
c    -( b^{1, 561}_2 ∧  b^{1, 561}_1 ∧  b^{1, 561}_0 ∧ true) 
c  in CNF:
c    -b^{1, 561}_2 ∨ -b^{1, 561}_1 ∨ -b^{1, 561}_0 ∨ false 
c  in DIMACS:
-2843 -2844 -2845  0

c i = 562
c  -2+1 --> -1
c    ( b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧  p_562) -> ( b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0)
c  in CNF:
c    -b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨  b^{1, 563}_2
c    -b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_1
c    -b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨  b^{1, 563}_0
c  in DIMACS:
-2846 -2847  2848 -562  2849 0
-2846 -2847  2848 -562 -2850 0
-2846 -2847  2848 -562  2851 0

c  -1+1 --> 0
c    ( b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0 ∧  p_562) -> (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧ -b^{1, 563}_0)
c  in CNF:
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_2
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_1
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_0
c  in DIMACS:
-2846  2847 -2848 -562 -2849 0
-2846  2847 -2848 -562 -2850 0
-2846  2847 -2848 -562 -2851 0

c  0+1 --> 1
c    (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧  p_562) -> (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0)
c  in CNF:
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_2
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_1
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨  b^{1, 563}_0
c  in DIMACS:
 2846  2847  2848 -562 -2849 0
 2846  2847  2848 -562 -2850 0
 2846  2847  2848 -562  2851 0

c  1+1 --> 2
c    (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0 ∧  p_562) -> (-b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0)
c  in CNF:
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_2
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨  b^{1, 563}_1
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ -p_562 ∨ -b^{1, 563}_0
c  in DIMACS:
 2846  2847 -2848 -562 -2849 0
 2846  2847 -2848 -562  2850 0
 2846  2847 -2848 -562 -2851 0

c  2+1 --> break 
c    (-b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧  p_562) -> break
c  in CNF:
c     b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ -p_562 ∨ break
c  in DIMACS:
 2846 -2847  2848 -562 1162 0


c  2-1 --> 1
c    (-b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧ -p_562) -> (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0)
c  in CNF:
c     b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_2
c     b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_1
c     b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨  b^{1, 563}_0
c  in DIMACS:
 2846 -2847  2848  562 -2849 0
 2846 -2847  2848  562 -2850 0
 2846 -2847  2848  562  2851 0

c  1-1 --> 0
c    (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0 ∧ -p_562) -> (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧ -b^{1, 563}_0)
c  in CNF:
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_2
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_1
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_0
c  in DIMACS:
 2846  2847 -2848  562 -2849 0
 2846  2847 -2848  562 -2850 0
 2846  2847 -2848  562 -2851 0

c  0-1 --> -1
c    (-b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧ -p_562) -> ( b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0)
c  in CNF:
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨  b^{1, 563}_2
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_1
c     b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨  b^{1, 563}_0
c  in DIMACS:
 2846  2847  2848  562  2849 0
 2846  2847  2848  562 -2850 0
 2846  2847  2848  562  2851 0

c  -1-1 --> -2
c    ( b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧  b^{1, 562}_0 ∧ -p_562) -> ( b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0)
c  in CNF:
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨  b^{1, 563}_2
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨  b^{1, 563}_1
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨  p_562 ∨ -b^{1, 563}_0
c  in DIMACS:
-2846  2847 -2848  562  2849 0
-2846  2847 -2848  562  2850 0
-2846  2847 -2848  562 -2851 0

c  -2-1 --> break 
c    ( b^{1, 562}_2 ∧  b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧ -p_562) -> break
c  in CNF:
c    -b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨  b^{1, 562}_0 ∨  p_562 ∨ break
c  in DIMACS:
-2846 -2847  2848  562 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 562}_2 ∧ -b^{1, 562}_1 ∧ -b^{1, 562}_0 ∧ true) 
c  in CNF:
c    -b^{1, 562}_2 ∨  b^{1, 562}_1 ∨  b^{1, 562}_0 ∨ false 
c  in DIMACS:
-2846  2847  2848  0

c  3 does not represent an automaton state.
c    -(-b^{1, 562}_2 ∧  b^{1, 562}_1 ∧  b^{1, 562}_0 ∧ true) 
c  in CNF:
c     b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ false 
c  in DIMACS:
 2846 -2847 -2848  0
c  -3 does not represent an automaton state.
c    -( b^{1, 562}_2 ∧  b^{1, 562}_1 ∧  b^{1, 562}_0 ∧ true) 
c  in CNF:
c    -b^{1, 562}_2 ∨ -b^{1, 562}_1 ∨ -b^{1, 562}_0 ∨ false 
c  in DIMACS:
-2846 -2847 -2848  0

c i = 563
c  -2+1 --> -1
c    ( b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧  p_563) -> ( b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0)
c  in CNF:
c    -b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨  b^{1, 564}_2
c    -b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_1
c    -b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨  b^{1, 564}_0
c  in DIMACS:
-2849 -2850  2851 -563  2852 0
-2849 -2850  2851 -563 -2853 0
-2849 -2850  2851 -563  2854 0

c  -1+1 --> 0
c    ( b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0 ∧  p_563) -> (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧ -b^{1, 564}_0)
c  in CNF:
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_2
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_1
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_0
c  in DIMACS:
-2849  2850 -2851 -563 -2852 0
-2849  2850 -2851 -563 -2853 0
-2849  2850 -2851 -563 -2854 0

c  0+1 --> 1
c    (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧  p_563) -> (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0)
c  in CNF:
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_2
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_1
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨  b^{1, 564}_0
c  in DIMACS:
 2849  2850  2851 -563 -2852 0
 2849  2850  2851 -563 -2853 0
 2849  2850  2851 -563  2854 0

c  1+1 --> 2
c    (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0 ∧  p_563) -> (-b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0)
c  in CNF:
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_2
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨  b^{1, 564}_1
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ -p_563 ∨ -b^{1, 564}_0
c  in DIMACS:
 2849  2850 -2851 -563 -2852 0
 2849  2850 -2851 -563  2853 0
 2849  2850 -2851 -563 -2854 0

c  2+1 --> break 
c    (-b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧  p_563) -> break
c  in CNF:
c     b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ -p_563 ∨ break
c  in DIMACS:
 2849 -2850  2851 -563 1162 0


c  2-1 --> 1
c    (-b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧ -p_563) -> (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0)
c  in CNF:
c     b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_2
c     b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_1
c     b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨  b^{1, 564}_0
c  in DIMACS:
 2849 -2850  2851  563 -2852 0
 2849 -2850  2851  563 -2853 0
 2849 -2850  2851  563  2854 0

c  1-1 --> 0
c    (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0 ∧ -p_563) -> (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧ -b^{1, 564}_0)
c  in CNF:
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_2
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_1
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_0
c  in DIMACS:
 2849  2850 -2851  563 -2852 0
 2849  2850 -2851  563 -2853 0
 2849  2850 -2851  563 -2854 0

c  0-1 --> -1
c    (-b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧ -p_563) -> ( b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0)
c  in CNF:
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨  b^{1, 564}_2
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_1
c     b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨  b^{1, 564}_0
c  in DIMACS:
 2849  2850  2851  563  2852 0
 2849  2850  2851  563 -2853 0
 2849  2850  2851  563  2854 0

c  -1-1 --> -2
c    ( b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧  b^{1, 563}_0 ∧ -p_563) -> ( b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0)
c  in CNF:
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨  b^{1, 564}_2
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨  b^{1, 564}_1
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨  p_563 ∨ -b^{1, 564}_0
c  in DIMACS:
-2849  2850 -2851  563  2852 0
-2849  2850 -2851  563  2853 0
-2849  2850 -2851  563 -2854 0

c  -2-1 --> break 
c    ( b^{1, 563}_2 ∧  b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧ -p_563) -> break
c  in CNF:
c    -b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨  b^{1, 563}_0 ∨  p_563 ∨ break
c  in DIMACS:
-2849 -2850  2851  563 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 563}_2 ∧ -b^{1, 563}_1 ∧ -b^{1, 563}_0 ∧ true) 
c  in CNF:
c    -b^{1, 563}_2 ∨  b^{1, 563}_1 ∨  b^{1, 563}_0 ∨ false 
c  in DIMACS:
-2849  2850  2851  0

c  3 does not represent an automaton state.
c    -(-b^{1, 563}_2 ∧  b^{1, 563}_1 ∧  b^{1, 563}_0 ∧ true) 
c  in CNF:
c     b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ false 
c  in DIMACS:
 2849 -2850 -2851  0
c  -3 does not represent an automaton state.
c    -( b^{1, 563}_2 ∧  b^{1, 563}_1 ∧  b^{1, 563}_0 ∧ true) 
c  in CNF:
c    -b^{1, 563}_2 ∨ -b^{1, 563}_1 ∨ -b^{1, 563}_0 ∨ false 
c  in DIMACS:
-2849 -2850 -2851  0

c i = 564
c  -2+1 --> -1
c    ( b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧  p_564) -> ( b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0)
c  in CNF:
c    -b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨  b^{1, 565}_2
c    -b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_1
c    -b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨  b^{1, 565}_0
c  in DIMACS:
-2852 -2853  2854 -564  2855 0
-2852 -2853  2854 -564 -2856 0
-2852 -2853  2854 -564  2857 0

c  -1+1 --> 0
c    ( b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0 ∧  p_564) -> (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧ -b^{1, 565}_0)
c  in CNF:
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_2
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_1
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_0
c  in DIMACS:
-2852  2853 -2854 -564 -2855 0
-2852  2853 -2854 -564 -2856 0
-2852  2853 -2854 -564 -2857 0

c  0+1 --> 1
c    (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧  p_564) -> (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0)
c  in CNF:
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_2
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_1
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨  b^{1, 565}_0
c  in DIMACS:
 2852  2853  2854 -564 -2855 0
 2852  2853  2854 -564 -2856 0
 2852  2853  2854 -564  2857 0

c  1+1 --> 2
c    (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0 ∧  p_564) -> (-b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0)
c  in CNF:
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_2
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨  b^{1, 565}_1
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ -p_564 ∨ -b^{1, 565}_0
c  in DIMACS:
 2852  2853 -2854 -564 -2855 0
 2852  2853 -2854 -564  2856 0
 2852  2853 -2854 -564 -2857 0

c  2+1 --> break 
c    (-b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧  p_564) -> break
c  in CNF:
c     b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 2852 -2853  2854 -564 1162 0


c  2-1 --> 1
c    (-b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧ -p_564) -> (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0)
c  in CNF:
c     b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_2
c     b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_1
c     b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨  b^{1, 565}_0
c  in DIMACS:
 2852 -2853  2854  564 -2855 0
 2852 -2853  2854  564 -2856 0
 2852 -2853  2854  564  2857 0

c  1-1 --> 0
c    (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0 ∧ -p_564) -> (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧ -b^{1, 565}_0)
c  in CNF:
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_2
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_1
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_0
c  in DIMACS:
 2852  2853 -2854  564 -2855 0
 2852  2853 -2854  564 -2856 0
 2852  2853 -2854  564 -2857 0

c  0-1 --> -1
c    (-b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧ -p_564) -> ( b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0)
c  in CNF:
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨  b^{1, 565}_2
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_1
c     b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨  b^{1, 565}_0
c  in DIMACS:
 2852  2853  2854  564  2855 0
 2852  2853  2854  564 -2856 0
 2852  2853  2854  564  2857 0

c  -1-1 --> -2
c    ( b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧  b^{1, 564}_0 ∧ -p_564) -> ( b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0)
c  in CNF:
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨  b^{1, 565}_2
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨  b^{1, 565}_1
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨  p_564 ∨ -b^{1, 565}_0
c  in DIMACS:
-2852  2853 -2854  564  2855 0
-2852  2853 -2854  564  2856 0
-2852  2853 -2854  564 -2857 0

c  -2-1 --> break 
c    ( b^{1, 564}_2 ∧  b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨  b^{1, 564}_0 ∨  p_564 ∨ break
c  in DIMACS:
-2852 -2853  2854  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 564}_2 ∧ -b^{1, 564}_1 ∧ -b^{1, 564}_0 ∧ true) 
c  in CNF:
c    -b^{1, 564}_2 ∨  b^{1, 564}_1 ∨  b^{1, 564}_0 ∨ false 
c  in DIMACS:
-2852  2853  2854  0

c  3 does not represent an automaton state.
c    -(-b^{1, 564}_2 ∧  b^{1, 564}_1 ∧  b^{1, 564}_0 ∧ true) 
c  in CNF:
c     b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ false 
c  in DIMACS:
 2852 -2853 -2854  0
c  -3 does not represent an automaton state.
c    -( b^{1, 564}_2 ∧  b^{1, 564}_1 ∧  b^{1, 564}_0 ∧ true) 
c  in CNF:
c    -b^{1, 564}_2 ∨ -b^{1, 564}_1 ∨ -b^{1, 564}_0 ∨ false 
c  in DIMACS:
-2852 -2853 -2854  0

c i = 565
c  -2+1 --> -1
c    ( b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧  p_565) -> ( b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0)
c  in CNF:
c    -b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨  b^{1, 566}_2
c    -b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_1
c    -b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨  b^{1, 566}_0
c  in DIMACS:
-2855 -2856  2857 -565  2858 0
-2855 -2856  2857 -565 -2859 0
-2855 -2856  2857 -565  2860 0

c  -1+1 --> 0
c    ( b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0 ∧  p_565) -> (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧ -b^{1, 566}_0)
c  in CNF:
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_2
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_1
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_0
c  in DIMACS:
-2855  2856 -2857 -565 -2858 0
-2855  2856 -2857 -565 -2859 0
-2855  2856 -2857 -565 -2860 0

c  0+1 --> 1
c    (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧  p_565) -> (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0)
c  in CNF:
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_2
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_1
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨  b^{1, 566}_0
c  in DIMACS:
 2855  2856  2857 -565 -2858 0
 2855  2856  2857 -565 -2859 0
 2855  2856  2857 -565  2860 0

c  1+1 --> 2
c    (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0 ∧  p_565) -> (-b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0)
c  in CNF:
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_2
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨  b^{1, 566}_1
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ -p_565 ∨ -b^{1, 566}_0
c  in DIMACS:
 2855  2856 -2857 -565 -2858 0
 2855  2856 -2857 -565  2859 0
 2855  2856 -2857 -565 -2860 0

c  2+1 --> break 
c    (-b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧  p_565) -> break
c  in CNF:
c     b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ -p_565 ∨ break
c  in DIMACS:
 2855 -2856  2857 -565 1162 0


c  2-1 --> 1
c    (-b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧ -p_565) -> (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0)
c  in CNF:
c     b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_2
c     b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_1
c     b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨  b^{1, 566}_0
c  in DIMACS:
 2855 -2856  2857  565 -2858 0
 2855 -2856  2857  565 -2859 0
 2855 -2856  2857  565  2860 0

c  1-1 --> 0
c    (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0 ∧ -p_565) -> (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧ -b^{1, 566}_0)
c  in CNF:
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_2
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_1
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_0
c  in DIMACS:
 2855  2856 -2857  565 -2858 0
 2855  2856 -2857  565 -2859 0
 2855  2856 -2857  565 -2860 0

c  0-1 --> -1
c    (-b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧ -p_565) -> ( b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0)
c  in CNF:
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨  b^{1, 566}_2
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_1
c     b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨  b^{1, 566}_0
c  in DIMACS:
 2855  2856  2857  565  2858 0
 2855  2856  2857  565 -2859 0
 2855  2856  2857  565  2860 0

c  -1-1 --> -2
c    ( b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧  b^{1, 565}_0 ∧ -p_565) -> ( b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0)
c  in CNF:
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨  b^{1, 566}_2
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨  b^{1, 566}_1
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨  p_565 ∨ -b^{1, 566}_0
c  in DIMACS:
-2855  2856 -2857  565  2858 0
-2855  2856 -2857  565  2859 0
-2855  2856 -2857  565 -2860 0

c  -2-1 --> break 
c    ( b^{1, 565}_2 ∧  b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧ -p_565) -> break
c  in CNF:
c    -b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨  b^{1, 565}_0 ∨  p_565 ∨ break
c  in DIMACS:
-2855 -2856  2857  565 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 565}_2 ∧ -b^{1, 565}_1 ∧ -b^{1, 565}_0 ∧ true) 
c  in CNF:
c    -b^{1, 565}_2 ∨  b^{1, 565}_1 ∨  b^{1, 565}_0 ∨ false 
c  in DIMACS:
-2855  2856  2857  0

c  3 does not represent an automaton state.
c    -(-b^{1, 565}_2 ∧  b^{1, 565}_1 ∧  b^{1, 565}_0 ∧ true) 
c  in CNF:
c     b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ false 
c  in DIMACS:
 2855 -2856 -2857  0
c  -3 does not represent an automaton state.
c    -( b^{1, 565}_2 ∧  b^{1, 565}_1 ∧  b^{1, 565}_0 ∧ true) 
c  in CNF:
c    -b^{1, 565}_2 ∨ -b^{1, 565}_1 ∨ -b^{1, 565}_0 ∨ false 
c  in DIMACS:
-2855 -2856 -2857  0

c i = 566
c  -2+1 --> -1
c    ( b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧  p_566) -> ( b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0)
c  in CNF:
c    -b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨  b^{1, 567}_2
c    -b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_1
c    -b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨  b^{1, 567}_0
c  in DIMACS:
-2858 -2859  2860 -566  2861 0
-2858 -2859  2860 -566 -2862 0
-2858 -2859  2860 -566  2863 0

c  -1+1 --> 0
c    ( b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0 ∧  p_566) -> (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧ -b^{1, 567}_0)
c  in CNF:
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_2
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_1
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_0
c  in DIMACS:
-2858  2859 -2860 -566 -2861 0
-2858  2859 -2860 -566 -2862 0
-2858  2859 -2860 -566 -2863 0

c  0+1 --> 1
c    (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧  p_566) -> (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0)
c  in CNF:
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_2
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_1
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨  b^{1, 567}_0
c  in DIMACS:
 2858  2859  2860 -566 -2861 0
 2858  2859  2860 -566 -2862 0
 2858  2859  2860 -566  2863 0

c  1+1 --> 2
c    (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0 ∧  p_566) -> (-b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0)
c  in CNF:
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_2
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨  b^{1, 567}_1
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ -p_566 ∨ -b^{1, 567}_0
c  in DIMACS:
 2858  2859 -2860 -566 -2861 0
 2858  2859 -2860 -566  2862 0
 2858  2859 -2860 -566 -2863 0

c  2+1 --> break 
c    (-b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧  p_566) -> break
c  in CNF:
c     b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ -p_566 ∨ break
c  in DIMACS:
 2858 -2859  2860 -566 1162 0


c  2-1 --> 1
c    (-b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧ -p_566) -> (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0)
c  in CNF:
c     b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_2
c     b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_1
c     b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨  b^{1, 567}_0
c  in DIMACS:
 2858 -2859  2860  566 -2861 0
 2858 -2859  2860  566 -2862 0
 2858 -2859  2860  566  2863 0

c  1-1 --> 0
c    (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0 ∧ -p_566) -> (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧ -b^{1, 567}_0)
c  in CNF:
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_2
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_1
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_0
c  in DIMACS:
 2858  2859 -2860  566 -2861 0
 2858  2859 -2860  566 -2862 0
 2858  2859 -2860  566 -2863 0

c  0-1 --> -1
c    (-b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧ -p_566) -> ( b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0)
c  in CNF:
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨  b^{1, 567}_2
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_1
c     b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨  b^{1, 567}_0
c  in DIMACS:
 2858  2859  2860  566  2861 0
 2858  2859  2860  566 -2862 0
 2858  2859  2860  566  2863 0

c  -1-1 --> -2
c    ( b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧  b^{1, 566}_0 ∧ -p_566) -> ( b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0)
c  in CNF:
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨  b^{1, 567}_2
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨  b^{1, 567}_1
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨  p_566 ∨ -b^{1, 567}_0
c  in DIMACS:
-2858  2859 -2860  566  2861 0
-2858  2859 -2860  566  2862 0
-2858  2859 -2860  566 -2863 0

c  -2-1 --> break 
c    ( b^{1, 566}_2 ∧  b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧ -p_566) -> break
c  in CNF:
c    -b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨  b^{1, 566}_0 ∨  p_566 ∨ break
c  in DIMACS:
-2858 -2859  2860  566 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 566}_2 ∧ -b^{1, 566}_1 ∧ -b^{1, 566}_0 ∧ true) 
c  in CNF:
c    -b^{1, 566}_2 ∨  b^{1, 566}_1 ∨  b^{1, 566}_0 ∨ false 
c  in DIMACS:
-2858  2859  2860  0

c  3 does not represent an automaton state.
c    -(-b^{1, 566}_2 ∧  b^{1, 566}_1 ∧  b^{1, 566}_0 ∧ true) 
c  in CNF:
c     b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ false 
c  in DIMACS:
 2858 -2859 -2860  0
c  -3 does not represent an automaton state.
c    -( b^{1, 566}_2 ∧  b^{1, 566}_1 ∧  b^{1, 566}_0 ∧ true) 
c  in CNF:
c    -b^{1, 566}_2 ∨ -b^{1, 566}_1 ∨ -b^{1, 566}_0 ∨ false 
c  in DIMACS:
-2858 -2859 -2860  0

c i = 567
c  -2+1 --> -1
c    ( b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧  p_567) -> ( b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0)
c  in CNF:
c    -b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨  b^{1, 568}_2
c    -b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_1
c    -b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨  b^{1, 568}_0
c  in DIMACS:
-2861 -2862  2863 -567  2864 0
-2861 -2862  2863 -567 -2865 0
-2861 -2862  2863 -567  2866 0

c  -1+1 --> 0
c    ( b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0 ∧  p_567) -> (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧ -b^{1, 568}_0)
c  in CNF:
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_2
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_1
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_0
c  in DIMACS:
-2861  2862 -2863 -567 -2864 0
-2861  2862 -2863 -567 -2865 0
-2861  2862 -2863 -567 -2866 0

c  0+1 --> 1
c    (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧  p_567) -> (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0)
c  in CNF:
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_2
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_1
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨  b^{1, 568}_0
c  in DIMACS:
 2861  2862  2863 -567 -2864 0
 2861  2862  2863 -567 -2865 0
 2861  2862  2863 -567  2866 0

c  1+1 --> 2
c    (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0 ∧  p_567) -> (-b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0)
c  in CNF:
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_2
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨  b^{1, 568}_1
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ -p_567 ∨ -b^{1, 568}_0
c  in DIMACS:
 2861  2862 -2863 -567 -2864 0
 2861  2862 -2863 -567  2865 0
 2861  2862 -2863 -567 -2866 0

c  2+1 --> break 
c    (-b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧  p_567) -> break
c  in CNF:
c     b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 2861 -2862  2863 -567 1162 0


c  2-1 --> 1
c    (-b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧ -p_567) -> (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0)
c  in CNF:
c     b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_2
c     b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_1
c     b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨  b^{1, 568}_0
c  in DIMACS:
 2861 -2862  2863  567 -2864 0
 2861 -2862  2863  567 -2865 0
 2861 -2862  2863  567  2866 0

c  1-1 --> 0
c    (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0 ∧ -p_567) -> (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧ -b^{1, 568}_0)
c  in CNF:
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_2
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_1
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_0
c  in DIMACS:
 2861  2862 -2863  567 -2864 0
 2861  2862 -2863  567 -2865 0
 2861  2862 -2863  567 -2866 0

c  0-1 --> -1
c    (-b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧ -p_567) -> ( b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0)
c  in CNF:
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨  b^{1, 568}_2
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_1
c     b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨  b^{1, 568}_0
c  in DIMACS:
 2861  2862  2863  567  2864 0
 2861  2862  2863  567 -2865 0
 2861  2862  2863  567  2866 0

c  -1-1 --> -2
c    ( b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧  b^{1, 567}_0 ∧ -p_567) -> ( b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0)
c  in CNF:
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨  b^{1, 568}_2
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨  b^{1, 568}_1
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨  p_567 ∨ -b^{1, 568}_0
c  in DIMACS:
-2861  2862 -2863  567  2864 0
-2861  2862 -2863  567  2865 0
-2861  2862 -2863  567 -2866 0

c  -2-1 --> break 
c    ( b^{1, 567}_2 ∧  b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨  b^{1, 567}_0 ∨  p_567 ∨ break
c  in DIMACS:
-2861 -2862  2863  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 567}_2 ∧ -b^{1, 567}_1 ∧ -b^{1, 567}_0 ∧ true) 
c  in CNF:
c    -b^{1, 567}_2 ∨  b^{1, 567}_1 ∨  b^{1, 567}_0 ∨ false 
c  in DIMACS:
-2861  2862  2863  0

c  3 does not represent an automaton state.
c    -(-b^{1, 567}_2 ∧  b^{1, 567}_1 ∧  b^{1, 567}_0 ∧ true) 
c  in CNF:
c     b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ false 
c  in DIMACS:
 2861 -2862 -2863  0
c  -3 does not represent an automaton state.
c    -( b^{1, 567}_2 ∧  b^{1, 567}_1 ∧  b^{1, 567}_0 ∧ true) 
c  in CNF:
c    -b^{1, 567}_2 ∨ -b^{1, 567}_1 ∨ -b^{1, 567}_0 ∨ false 
c  in DIMACS:
-2861 -2862 -2863  0

c i = 568
c  -2+1 --> -1
c    ( b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧  p_568) -> ( b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0)
c  in CNF:
c    -b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨  b^{1, 569}_2
c    -b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_1
c    -b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨  b^{1, 569}_0
c  in DIMACS:
-2864 -2865  2866 -568  2867 0
-2864 -2865  2866 -568 -2868 0
-2864 -2865  2866 -568  2869 0

c  -1+1 --> 0
c    ( b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0 ∧  p_568) -> (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧ -b^{1, 569}_0)
c  in CNF:
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_2
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_1
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_0
c  in DIMACS:
-2864  2865 -2866 -568 -2867 0
-2864  2865 -2866 -568 -2868 0
-2864  2865 -2866 -568 -2869 0

c  0+1 --> 1
c    (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧  p_568) -> (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0)
c  in CNF:
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_2
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_1
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨  b^{1, 569}_0
c  in DIMACS:
 2864  2865  2866 -568 -2867 0
 2864  2865  2866 -568 -2868 0
 2864  2865  2866 -568  2869 0

c  1+1 --> 2
c    (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0 ∧  p_568) -> (-b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0)
c  in CNF:
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_2
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨  b^{1, 569}_1
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ -p_568 ∨ -b^{1, 569}_0
c  in DIMACS:
 2864  2865 -2866 -568 -2867 0
 2864  2865 -2866 -568  2868 0
 2864  2865 -2866 -568 -2869 0

c  2+1 --> break 
c    (-b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧  p_568) -> break
c  in CNF:
c     b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 2864 -2865  2866 -568 1162 0


c  2-1 --> 1
c    (-b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧ -p_568) -> (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0)
c  in CNF:
c     b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_2
c     b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_1
c     b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨  b^{1, 569}_0
c  in DIMACS:
 2864 -2865  2866  568 -2867 0
 2864 -2865  2866  568 -2868 0
 2864 -2865  2866  568  2869 0

c  1-1 --> 0
c    (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0 ∧ -p_568) -> (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧ -b^{1, 569}_0)
c  in CNF:
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_2
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_1
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_0
c  in DIMACS:
 2864  2865 -2866  568 -2867 0
 2864  2865 -2866  568 -2868 0
 2864  2865 -2866  568 -2869 0

c  0-1 --> -1
c    (-b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧ -p_568) -> ( b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0)
c  in CNF:
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨  b^{1, 569}_2
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_1
c     b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨  b^{1, 569}_0
c  in DIMACS:
 2864  2865  2866  568  2867 0
 2864  2865  2866  568 -2868 0
 2864  2865  2866  568  2869 0

c  -1-1 --> -2
c    ( b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧  b^{1, 568}_0 ∧ -p_568) -> ( b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0)
c  in CNF:
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨  b^{1, 569}_2
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨  b^{1, 569}_1
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨  p_568 ∨ -b^{1, 569}_0
c  in DIMACS:
-2864  2865 -2866  568  2867 0
-2864  2865 -2866  568  2868 0
-2864  2865 -2866  568 -2869 0

c  -2-1 --> break 
c    ( b^{1, 568}_2 ∧  b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨  b^{1, 568}_0 ∨  p_568 ∨ break
c  in DIMACS:
-2864 -2865  2866  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 568}_2 ∧ -b^{1, 568}_1 ∧ -b^{1, 568}_0 ∧ true) 
c  in CNF:
c    -b^{1, 568}_2 ∨  b^{1, 568}_1 ∨  b^{1, 568}_0 ∨ false 
c  in DIMACS:
-2864  2865  2866  0

c  3 does not represent an automaton state.
c    -(-b^{1, 568}_2 ∧  b^{1, 568}_1 ∧  b^{1, 568}_0 ∧ true) 
c  in CNF:
c     b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ false 
c  in DIMACS:
 2864 -2865 -2866  0
c  -3 does not represent an automaton state.
c    -( b^{1, 568}_2 ∧  b^{1, 568}_1 ∧  b^{1, 568}_0 ∧ true) 
c  in CNF:
c    -b^{1, 568}_2 ∨ -b^{1, 568}_1 ∨ -b^{1, 568}_0 ∨ false 
c  in DIMACS:
-2864 -2865 -2866  0

c i = 569
c  -2+1 --> -1
c    ( b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧  p_569) -> ( b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0)
c  in CNF:
c    -b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨  b^{1, 570}_2
c    -b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_1
c    -b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨  b^{1, 570}_0
c  in DIMACS:
-2867 -2868  2869 -569  2870 0
-2867 -2868  2869 -569 -2871 0
-2867 -2868  2869 -569  2872 0

c  -1+1 --> 0
c    ( b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0 ∧  p_569) -> (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧ -b^{1, 570}_0)
c  in CNF:
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_2
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_1
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_0
c  in DIMACS:
-2867  2868 -2869 -569 -2870 0
-2867  2868 -2869 -569 -2871 0
-2867  2868 -2869 -569 -2872 0

c  0+1 --> 1
c    (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧  p_569) -> (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0)
c  in CNF:
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_2
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_1
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨  b^{1, 570}_0
c  in DIMACS:
 2867  2868  2869 -569 -2870 0
 2867  2868  2869 -569 -2871 0
 2867  2868  2869 -569  2872 0

c  1+1 --> 2
c    (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0 ∧  p_569) -> (-b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0)
c  in CNF:
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_2
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨  b^{1, 570}_1
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ -p_569 ∨ -b^{1, 570}_0
c  in DIMACS:
 2867  2868 -2869 -569 -2870 0
 2867  2868 -2869 -569  2871 0
 2867  2868 -2869 -569 -2872 0

c  2+1 --> break 
c    (-b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧  p_569) -> break
c  in CNF:
c     b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ -p_569 ∨ break
c  in DIMACS:
 2867 -2868  2869 -569 1162 0


c  2-1 --> 1
c    (-b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧ -p_569) -> (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0)
c  in CNF:
c     b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_2
c     b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_1
c     b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨  b^{1, 570}_0
c  in DIMACS:
 2867 -2868  2869  569 -2870 0
 2867 -2868  2869  569 -2871 0
 2867 -2868  2869  569  2872 0

c  1-1 --> 0
c    (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0 ∧ -p_569) -> (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧ -b^{1, 570}_0)
c  in CNF:
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_2
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_1
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_0
c  in DIMACS:
 2867  2868 -2869  569 -2870 0
 2867  2868 -2869  569 -2871 0
 2867  2868 -2869  569 -2872 0

c  0-1 --> -1
c    (-b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧ -p_569) -> ( b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0)
c  in CNF:
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨  b^{1, 570}_2
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_1
c     b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨  b^{1, 570}_0
c  in DIMACS:
 2867  2868  2869  569  2870 0
 2867  2868  2869  569 -2871 0
 2867  2868  2869  569  2872 0

c  -1-1 --> -2
c    ( b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧  b^{1, 569}_0 ∧ -p_569) -> ( b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0)
c  in CNF:
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨  b^{1, 570}_2
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨  b^{1, 570}_1
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨  p_569 ∨ -b^{1, 570}_0
c  in DIMACS:
-2867  2868 -2869  569  2870 0
-2867  2868 -2869  569  2871 0
-2867  2868 -2869  569 -2872 0

c  -2-1 --> break 
c    ( b^{1, 569}_2 ∧  b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧ -p_569) -> break
c  in CNF:
c    -b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨  b^{1, 569}_0 ∨  p_569 ∨ break
c  in DIMACS:
-2867 -2868  2869  569 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 569}_2 ∧ -b^{1, 569}_1 ∧ -b^{1, 569}_0 ∧ true) 
c  in CNF:
c    -b^{1, 569}_2 ∨  b^{1, 569}_1 ∨  b^{1, 569}_0 ∨ false 
c  in DIMACS:
-2867  2868  2869  0

c  3 does not represent an automaton state.
c    -(-b^{1, 569}_2 ∧  b^{1, 569}_1 ∧  b^{1, 569}_0 ∧ true) 
c  in CNF:
c     b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ false 
c  in DIMACS:
 2867 -2868 -2869  0
c  -3 does not represent an automaton state.
c    -( b^{1, 569}_2 ∧  b^{1, 569}_1 ∧  b^{1, 569}_0 ∧ true) 
c  in CNF:
c    -b^{1, 569}_2 ∨ -b^{1, 569}_1 ∨ -b^{1, 569}_0 ∨ false 
c  in DIMACS:
-2867 -2868 -2869  0

c i = 570
c  -2+1 --> -1
c    ( b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧  p_570) -> ( b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0)
c  in CNF:
c    -b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨  b^{1, 571}_2
c    -b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_1
c    -b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨  b^{1, 571}_0
c  in DIMACS:
-2870 -2871  2872 -570  2873 0
-2870 -2871  2872 -570 -2874 0
-2870 -2871  2872 -570  2875 0

c  -1+1 --> 0
c    ( b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0 ∧  p_570) -> (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧ -b^{1, 571}_0)
c  in CNF:
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_2
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_1
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_0
c  in DIMACS:
-2870  2871 -2872 -570 -2873 0
-2870  2871 -2872 -570 -2874 0
-2870  2871 -2872 -570 -2875 0

c  0+1 --> 1
c    (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧  p_570) -> (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0)
c  in CNF:
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_2
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_1
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨  b^{1, 571}_0
c  in DIMACS:
 2870  2871  2872 -570 -2873 0
 2870  2871  2872 -570 -2874 0
 2870  2871  2872 -570  2875 0

c  1+1 --> 2
c    (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0 ∧  p_570) -> (-b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0)
c  in CNF:
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_2
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨  b^{1, 571}_1
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ -p_570 ∨ -b^{1, 571}_0
c  in DIMACS:
 2870  2871 -2872 -570 -2873 0
 2870  2871 -2872 -570  2874 0
 2870  2871 -2872 -570 -2875 0

c  2+1 --> break 
c    (-b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧  p_570) -> break
c  in CNF:
c     b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 2870 -2871  2872 -570 1162 0


c  2-1 --> 1
c    (-b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧ -p_570) -> (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0)
c  in CNF:
c     b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_2
c     b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_1
c     b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨  b^{1, 571}_0
c  in DIMACS:
 2870 -2871  2872  570 -2873 0
 2870 -2871  2872  570 -2874 0
 2870 -2871  2872  570  2875 0

c  1-1 --> 0
c    (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0 ∧ -p_570) -> (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧ -b^{1, 571}_0)
c  in CNF:
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_2
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_1
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_0
c  in DIMACS:
 2870  2871 -2872  570 -2873 0
 2870  2871 -2872  570 -2874 0
 2870  2871 -2872  570 -2875 0

c  0-1 --> -1
c    (-b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧ -p_570) -> ( b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0)
c  in CNF:
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨  b^{1, 571}_2
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_1
c     b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨  b^{1, 571}_0
c  in DIMACS:
 2870  2871  2872  570  2873 0
 2870  2871  2872  570 -2874 0
 2870  2871  2872  570  2875 0

c  -1-1 --> -2
c    ( b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧  b^{1, 570}_0 ∧ -p_570) -> ( b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0)
c  in CNF:
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨  b^{1, 571}_2
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨  b^{1, 571}_1
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨  p_570 ∨ -b^{1, 571}_0
c  in DIMACS:
-2870  2871 -2872  570  2873 0
-2870  2871 -2872  570  2874 0
-2870  2871 -2872  570 -2875 0

c  -2-1 --> break 
c    ( b^{1, 570}_2 ∧  b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨  b^{1, 570}_0 ∨  p_570 ∨ break
c  in DIMACS:
-2870 -2871  2872  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 570}_2 ∧ -b^{1, 570}_1 ∧ -b^{1, 570}_0 ∧ true) 
c  in CNF:
c    -b^{1, 570}_2 ∨  b^{1, 570}_1 ∨  b^{1, 570}_0 ∨ false 
c  in DIMACS:
-2870  2871  2872  0

c  3 does not represent an automaton state.
c    -(-b^{1, 570}_2 ∧  b^{1, 570}_1 ∧  b^{1, 570}_0 ∧ true) 
c  in CNF:
c     b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ false 
c  in DIMACS:
 2870 -2871 -2872  0
c  -3 does not represent an automaton state.
c    -( b^{1, 570}_2 ∧  b^{1, 570}_1 ∧  b^{1, 570}_0 ∧ true) 
c  in CNF:
c    -b^{1, 570}_2 ∨ -b^{1, 570}_1 ∨ -b^{1, 570}_0 ∨ false 
c  in DIMACS:
-2870 -2871 -2872  0

c i = 571
c  -2+1 --> -1
c    ( b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧  p_571) -> ( b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0)
c  in CNF:
c    -b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨  b^{1, 572}_2
c    -b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_1
c    -b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨  b^{1, 572}_0
c  in DIMACS:
-2873 -2874  2875 -571  2876 0
-2873 -2874  2875 -571 -2877 0
-2873 -2874  2875 -571  2878 0

c  -1+1 --> 0
c    ( b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0 ∧  p_571) -> (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧ -b^{1, 572}_0)
c  in CNF:
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_2
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_1
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_0
c  in DIMACS:
-2873  2874 -2875 -571 -2876 0
-2873  2874 -2875 -571 -2877 0
-2873  2874 -2875 -571 -2878 0

c  0+1 --> 1
c    (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧  p_571) -> (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0)
c  in CNF:
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_2
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_1
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨  b^{1, 572}_0
c  in DIMACS:
 2873  2874  2875 -571 -2876 0
 2873  2874  2875 -571 -2877 0
 2873  2874  2875 -571  2878 0

c  1+1 --> 2
c    (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0 ∧  p_571) -> (-b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0)
c  in CNF:
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_2
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨  b^{1, 572}_1
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ -p_571 ∨ -b^{1, 572}_0
c  in DIMACS:
 2873  2874 -2875 -571 -2876 0
 2873  2874 -2875 -571  2877 0
 2873  2874 -2875 -571 -2878 0

c  2+1 --> break 
c    (-b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧  p_571) -> break
c  in CNF:
c     b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ -p_571 ∨ break
c  in DIMACS:
 2873 -2874  2875 -571 1162 0


c  2-1 --> 1
c    (-b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧ -p_571) -> (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0)
c  in CNF:
c     b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_2
c     b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_1
c     b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨  b^{1, 572}_0
c  in DIMACS:
 2873 -2874  2875  571 -2876 0
 2873 -2874  2875  571 -2877 0
 2873 -2874  2875  571  2878 0

c  1-1 --> 0
c    (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0 ∧ -p_571) -> (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧ -b^{1, 572}_0)
c  in CNF:
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_2
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_1
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_0
c  in DIMACS:
 2873  2874 -2875  571 -2876 0
 2873  2874 -2875  571 -2877 0
 2873  2874 -2875  571 -2878 0

c  0-1 --> -1
c    (-b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧ -p_571) -> ( b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0)
c  in CNF:
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨  b^{1, 572}_2
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_1
c     b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨  b^{1, 572}_0
c  in DIMACS:
 2873  2874  2875  571  2876 0
 2873  2874  2875  571 -2877 0
 2873  2874  2875  571  2878 0

c  -1-1 --> -2
c    ( b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧  b^{1, 571}_0 ∧ -p_571) -> ( b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0)
c  in CNF:
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨  b^{1, 572}_2
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨  b^{1, 572}_1
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨  p_571 ∨ -b^{1, 572}_0
c  in DIMACS:
-2873  2874 -2875  571  2876 0
-2873  2874 -2875  571  2877 0
-2873  2874 -2875  571 -2878 0

c  -2-1 --> break 
c    ( b^{1, 571}_2 ∧  b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧ -p_571) -> break
c  in CNF:
c    -b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨  b^{1, 571}_0 ∨  p_571 ∨ break
c  in DIMACS:
-2873 -2874  2875  571 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 571}_2 ∧ -b^{1, 571}_1 ∧ -b^{1, 571}_0 ∧ true) 
c  in CNF:
c    -b^{1, 571}_2 ∨  b^{1, 571}_1 ∨  b^{1, 571}_0 ∨ false 
c  in DIMACS:
-2873  2874  2875  0

c  3 does not represent an automaton state.
c    -(-b^{1, 571}_2 ∧  b^{1, 571}_1 ∧  b^{1, 571}_0 ∧ true) 
c  in CNF:
c     b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ false 
c  in DIMACS:
 2873 -2874 -2875  0
c  -3 does not represent an automaton state.
c    -( b^{1, 571}_2 ∧  b^{1, 571}_1 ∧  b^{1, 571}_0 ∧ true) 
c  in CNF:
c    -b^{1, 571}_2 ∨ -b^{1, 571}_1 ∨ -b^{1, 571}_0 ∨ false 
c  in DIMACS:
-2873 -2874 -2875  0

c i = 572
c  -2+1 --> -1
c    ( b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧  p_572) -> ( b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0)
c  in CNF:
c    -b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨  b^{1, 573}_2
c    -b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_1
c    -b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨  b^{1, 573}_0
c  in DIMACS:
-2876 -2877  2878 -572  2879 0
-2876 -2877  2878 -572 -2880 0
-2876 -2877  2878 -572  2881 0

c  -1+1 --> 0
c    ( b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0 ∧  p_572) -> (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧ -b^{1, 573}_0)
c  in CNF:
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_2
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_1
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_0
c  in DIMACS:
-2876  2877 -2878 -572 -2879 0
-2876  2877 -2878 -572 -2880 0
-2876  2877 -2878 -572 -2881 0

c  0+1 --> 1
c    (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧  p_572) -> (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0)
c  in CNF:
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_2
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_1
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨  b^{1, 573}_0
c  in DIMACS:
 2876  2877  2878 -572 -2879 0
 2876  2877  2878 -572 -2880 0
 2876  2877  2878 -572  2881 0

c  1+1 --> 2
c    (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0 ∧  p_572) -> (-b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0)
c  in CNF:
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_2
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨  b^{1, 573}_1
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ -p_572 ∨ -b^{1, 573}_0
c  in DIMACS:
 2876  2877 -2878 -572 -2879 0
 2876  2877 -2878 -572  2880 0
 2876  2877 -2878 -572 -2881 0

c  2+1 --> break 
c    (-b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧  p_572) -> break
c  in CNF:
c     b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 2876 -2877  2878 -572 1162 0


c  2-1 --> 1
c    (-b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧ -p_572) -> (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0)
c  in CNF:
c     b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_2
c     b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_1
c     b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨  b^{1, 573}_0
c  in DIMACS:
 2876 -2877  2878  572 -2879 0
 2876 -2877  2878  572 -2880 0
 2876 -2877  2878  572  2881 0

c  1-1 --> 0
c    (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0 ∧ -p_572) -> (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧ -b^{1, 573}_0)
c  in CNF:
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_2
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_1
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_0
c  in DIMACS:
 2876  2877 -2878  572 -2879 0
 2876  2877 -2878  572 -2880 0
 2876  2877 -2878  572 -2881 0

c  0-1 --> -1
c    (-b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧ -p_572) -> ( b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0)
c  in CNF:
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨  b^{1, 573}_2
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_1
c     b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨  b^{1, 573}_0
c  in DIMACS:
 2876  2877  2878  572  2879 0
 2876  2877  2878  572 -2880 0
 2876  2877  2878  572  2881 0

c  -1-1 --> -2
c    ( b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧  b^{1, 572}_0 ∧ -p_572) -> ( b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0)
c  in CNF:
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨  b^{1, 573}_2
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨  b^{1, 573}_1
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨  p_572 ∨ -b^{1, 573}_0
c  in DIMACS:
-2876  2877 -2878  572  2879 0
-2876  2877 -2878  572  2880 0
-2876  2877 -2878  572 -2881 0

c  -2-1 --> break 
c    ( b^{1, 572}_2 ∧  b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨  b^{1, 572}_0 ∨  p_572 ∨ break
c  in DIMACS:
-2876 -2877  2878  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 572}_2 ∧ -b^{1, 572}_1 ∧ -b^{1, 572}_0 ∧ true) 
c  in CNF:
c    -b^{1, 572}_2 ∨  b^{1, 572}_1 ∨  b^{1, 572}_0 ∨ false 
c  in DIMACS:
-2876  2877  2878  0

c  3 does not represent an automaton state.
c    -(-b^{1, 572}_2 ∧  b^{1, 572}_1 ∧  b^{1, 572}_0 ∧ true) 
c  in CNF:
c     b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ false 
c  in DIMACS:
 2876 -2877 -2878  0
c  -3 does not represent an automaton state.
c    -( b^{1, 572}_2 ∧  b^{1, 572}_1 ∧  b^{1, 572}_0 ∧ true) 
c  in CNF:
c    -b^{1, 572}_2 ∨ -b^{1, 572}_1 ∨ -b^{1, 572}_0 ∨ false 
c  in DIMACS:
-2876 -2877 -2878  0

c i = 573
c  -2+1 --> -1
c    ( b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧  p_573) -> ( b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0)
c  in CNF:
c    -b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨  b^{1, 574}_2
c    -b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_1
c    -b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨  b^{1, 574}_0
c  in DIMACS:
-2879 -2880  2881 -573  2882 0
-2879 -2880  2881 -573 -2883 0
-2879 -2880  2881 -573  2884 0

c  -1+1 --> 0
c    ( b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0 ∧  p_573) -> (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧ -b^{1, 574}_0)
c  in CNF:
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_2
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_1
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_0
c  in DIMACS:
-2879  2880 -2881 -573 -2882 0
-2879  2880 -2881 -573 -2883 0
-2879  2880 -2881 -573 -2884 0

c  0+1 --> 1
c    (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧  p_573) -> (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0)
c  in CNF:
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_2
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_1
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨  b^{1, 574}_0
c  in DIMACS:
 2879  2880  2881 -573 -2882 0
 2879  2880  2881 -573 -2883 0
 2879  2880  2881 -573  2884 0

c  1+1 --> 2
c    (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0 ∧  p_573) -> (-b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0)
c  in CNF:
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_2
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨  b^{1, 574}_1
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ -p_573 ∨ -b^{1, 574}_0
c  in DIMACS:
 2879  2880 -2881 -573 -2882 0
 2879  2880 -2881 -573  2883 0
 2879  2880 -2881 -573 -2884 0

c  2+1 --> break 
c    (-b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧  p_573) -> break
c  in CNF:
c     b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ -p_573 ∨ break
c  in DIMACS:
 2879 -2880  2881 -573 1162 0


c  2-1 --> 1
c    (-b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧ -p_573) -> (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0)
c  in CNF:
c     b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_2
c     b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_1
c     b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨  b^{1, 574}_0
c  in DIMACS:
 2879 -2880  2881  573 -2882 0
 2879 -2880  2881  573 -2883 0
 2879 -2880  2881  573  2884 0

c  1-1 --> 0
c    (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0 ∧ -p_573) -> (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧ -b^{1, 574}_0)
c  in CNF:
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_2
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_1
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_0
c  in DIMACS:
 2879  2880 -2881  573 -2882 0
 2879  2880 -2881  573 -2883 0
 2879  2880 -2881  573 -2884 0

c  0-1 --> -1
c    (-b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧ -p_573) -> ( b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0)
c  in CNF:
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨  b^{1, 574}_2
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_1
c     b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨  b^{1, 574}_0
c  in DIMACS:
 2879  2880  2881  573  2882 0
 2879  2880  2881  573 -2883 0
 2879  2880  2881  573  2884 0

c  -1-1 --> -2
c    ( b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧  b^{1, 573}_0 ∧ -p_573) -> ( b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0)
c  in CNF:
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨  b^{1, 574}_2
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨  b^{1, 574}_1
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨  p_573 ∨ -b^{1, 574}_0
c  in DIMACS:
-2879  2880 -2881  573  2882 0
-2879  2880 -2881  573  2883 0
-2879  2880 -2881  573 -2884 0

c  -2-1 --> break 
c    ( b^{1, 573}_2 ∧  b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧ -p_573) -> break
c  in CNF:
c    -b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨  b^{1, 573}_0 ∨  p_573 ∨ break
c  in DIMACS:
-2879 -2880  2881  573 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 573}_2 ∧ -b^{1, 573}_1 ∧ -b^{1, 573}_0 ∧ true) 
c  in CNF:
c    -b^{1, 573}_2 ∨  b^{1, 573}_1 ∨  b^{1, 573}_0 ∨ false 
c  in DIMACS:
-2879  2880  2881  0

c  3 does not represent an automaton state.
c    -(-b^{1, 573}_2 ∧  b^{1, 573}_1 ∧  b^{1, 573}_0 ∧ true) 
c  in CNF:
c     b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ false 
c  in DIMACS:
 2879 -2880 -2881  0
c  -3 does not represent an automaton state.
c    -( b^{1, 573}_2 ∧  b^{1, 573}_1 ∧  b^{1, 573}_0 ∧ true) 
c  in CNF:
c    -b^{1, 573}_2 ∨ -b^{1, 573}_1 ∨ -b^{1, 573}_0 ∨ false 
c  in DIMACS:
-2879 -2880 -2881  0

c i = 574
c  -2+1 --> -1
c    ( b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧  p_574) -> ( b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0)
c  in CNF:
c    -b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨  b^{1, 575}_2
c    -b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_1
c    -b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨  b^{1, 575}_0
c  in DIMACS:
-2882 -2883  2884 -574  2885 0
-2882 -2883  2884 -574 -2886 0
-2882 -2883  2884 -574  2887 0

c  -1+1 --> 0
c    ( b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0 ∧  p_574) -> (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧ -b^{1, 575}_0)
c  in CNF:
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_2
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_1
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_0
c  in DIMACS:
-2882  2883 -2884 -574 -2885 0
-2882  2883 -2884 -574 -2886 0
-2882  2883 -2884 -574 -2887 0

c  0+1 --> 1
c    (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧  p_574) -> (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0)
c  in CNF:
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_2
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_1
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨  b^{1, 575}_0
c  in DIMACS:
 2882  2883  2884 -574 -2885 0
 2882  2883  2884 -574 -2886 0
 2882  2883  2884 -574  2887 0

c  1+1 --> 2
c    (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0 ∧  p_574) -> (-b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0)
c  in CNF:
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_2
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨  b^{1, 575}_1
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ -p_574 ∨ -b^{1, 575}_0
c  in DIMACS:
 2882  2883 -2884 -574 -2885 0
 2882  2883 -2884 -574  2886 0
 2882  2883 -2884 -574 -2887 0

c  2+1 --> break 
c    (-b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧  p_574) -> break
c  in CNF:
c     b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 2882 -2883  2884 -574 1162 0


c  2-1 --> 1
c    (-b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧ -p_574) -> (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0)
c  in CNF:
c     b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_2
c     b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_1
c     b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨  b^{1, 575}_0
c  in DIMACS:
 2882 -2883  2884  574 -2885 0
 2882 -2883  2884  574 -2886 0
 2882 -2883  2884  574  2887 0

c  1-1 --> 0
c    (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0 ∧ -p_574) -> (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧ -b^{1, 575}_0)
c  in CNF:
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_2
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_1
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_0
c  in DIMACS:
 2882  2883 -2884  574 -2885 0
 2882  2883 -2884  574 -2886 0
 2882  2883 -2884  574 -2887 0

c  0-1 --> -1
c    (-b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧ -p_574) -> ( b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0)
c  in CNF:
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨  b^{1, 575}_2
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_1
c     b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨  b^{1, 575}_0
c  in DIMACS:
 2882  2883  2884  574  2885 0
 2882  2883  2884  574 -2886 0
 2882  2883  2884  574  2887 0

c  -1-1 --> -2
c    ( b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧  b^{1, 574}_0 ∧ -p_574) -> ( b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0)
c  in CNF:
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨  b^{1, 575}_2
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨  b^{1, 575}_1
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨  p_574 ∨ -b^{1, 575}_0
c  in DIMACS:
-2882  2883 -2884  574  2885 0
-2882  2883 -2884  574  2886 0
-2882  2883 -2884  574 -2887 0

c  -2-1 --> break 
c    ( b^{1, 574}_2 ∧  b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨  b^{1, 574}_0 ∨  p_574 ∨ break
c  in DIMACS:
-2882 -2883  2884  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 574}_2 ∧ -b^{1, 574}_1 ∧ -b^{1, 574}_0 ∧ true) 
c  in CNF:
c    -b^{1, 574}_2 ∨  b^{1, 574}_1 ∨  b^{1, 574}_0 ∨ false 
c  in DIMACS:
-2882  2883  2884  0

c  3 does not represent an automaton state.
c    -(-b^{1, 574}_2 ∧  b^{1, 574}_1 ∧  b^{1, 574}_0 ∧ true) 
c  in CNF:
c     b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ false 
c  in DIMACS:
 2882 -2883 -2884  0
c  -3 does not represent an automaton state.
c    -( b^{1, 574}_2 ∧  b^{1, 574}_1 ∧  b^{1, 574}_0 ∧ true) 
c  in CNF:
c    -b^{1, 574}_2 ∨ -b^{1, 574}_1 ∨ -b^{1, 574}_0 ∨ false 
c  in DIMACS:
-2882 -2883 -2884  0

c i = 575
c  -2+1 --> -1
c    ( b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧  p_575) -> ( b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0)
c  in CNF:
c    -b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨  b^{1, 576}_2
c    -b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_1
c    -b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨  b^{1, 576}_0
c  in DIMACS:
-2885 -2886  2887 -575  2888 0
-2885 -2886  2887 -575 -2889 0
-2885 -2886  2887 -575  2890 0

c  -1+1 --> 0
c    ( b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0 ∧  p_575) -> (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧ -b^{1, 576}_0)
c  in CNF:
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_2
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_1
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_0
c  in DIMACS:
-2885  2886 -2887 -575 -2888 0
-2885  2886 -2887 -575 -2889 0
-2885  2886 -2887 -575 -2890 0

c  0+1 --> 1
c    (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧  p_575) -> (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0)
c  in CNF:
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_2
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_1
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨  b^{1, 576}_0
c  in DIMACS:
 2885  2886  2887 -575 -2888 0
 2885  2886  2887 -575 -2889 0
 2885  2886  2887 -575  2890 0

c  1+1 --> 2
c    (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0 ∧  p_575) -> (-b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0)
c  in CNF:
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_2
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨  b^{1, 576}_1
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ -p_575 ∨ -b^{1, 576}_0
c  in DIMACS:
 2885  2886 -2887 -575 -2888 0
 2885  2886 -2887 -575  2889 0
 2885  2886 -2887 -575 -2890 0

c  2+1 --> break 
c    (-b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧  p_575) -> break
c  in CNF:
c     b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ -p_575 ∨ break
c  in DIMACS:
 2885 -2886  2887 -575 1162 0


c  2-1 --> 1
c    (-b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧ -p_575) -> (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0)
c  in CNF:
c     b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_2
c     b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_1
c     b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨  b^{1, 576}_0
c  in DIMACS:
 2885 -2886  2887  575 -2888 0
 2885 -2886  2887  575 -2889 0
 2885 -2886  2887  575  2890 0

c  1-1 --> 0
c    (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0 ∧ -p_575) -> (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧ -b^{1, 576}_0)
c  in CNF:
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_2
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_1
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_0
c  in DIMACS:
 2885  2886 -2887  575 -2888 0
 2885  2886 -2887  575 -2889 0
 2885  2886 -2887  575 -2890 0

c  0-1 --> -1
c    (-b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧ -p_575) -> ( b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0)
c  in CNF:
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨  b^{1, 576}_2
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_1
c     b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨  b^{1, 576}_0
c  in DIMACS:
 2885  2886  2887  575  2888 0
 2885  2886  2887  575 -2889 0
 2885  2886  2887  575  2890 0

c  -1-1 --> -2
c    ( b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧  b^{1, 575}_0 ∧ -p_575) -> ( b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0)
c  in CNF:
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨  b^{1, 576}_2
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨  b^{1, 576}_1
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨  p_575 ∨ -b^{1, 576}_0
c  in DIMACS:
-2885  2886 -2887  575  2888 0
-2885  2886 -2887  575  2889 0
-2885  2886 -2887  575 -2890 0

c  -2-1 --> break 
c    ( b^{1, 575}_2 ∧  b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧ -p_575) -> break
c  in CNF:
c    -b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨  b^{1, 575}_0 ∨  p_575 ∨ break
c  in DIMACS:
-2885 -2886  2887  575 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 575}_2 ∧ -b^{1, 575}_1 ∧ -b^{1, 575}_0 ∧ true) 
c  in CNF:
c    -b^{1, 575}_2 ∨  b^{1, 575}_1 ∨  b^{1, 575}_0 ∨ false 
c  in DIMACS:
-2885  2886  2887  0

c  3 does not represent an automaton state.
c    -(-b^{1, 575}_2 ∧  b^{1, 575}_1 ∧  b^{1, 575}_0 ∧ true) 
c  in CNF:
c     b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ false 
c  in DIMACS:
 2885 -2886 -2887  0
c  -3 does not represent an automaton state.
c    -( b^{1, 575}_2 ∧  b^{1, 575}_1 ∧  b^{1, 575}_0 ∧ true) 
c  in CNF:
c    -b^{1, 575}_2 ∨ -b^{1, 575}_1 ∨ -b^{1, 575}_0 ∨ false 
c  in DIMACS:
-2885 -2886 -2887  0

c i = 576
c  -2+1 --> -1
c    ( b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧  p_576) -> ( b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0)
c  in CNF:
c    -b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨  b^{1, 577}_2
c    -b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_1
c    -b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨  b^{1, 577}_0
c  in DIMACS:
-2888 -2889  2890 -576  2891 0
-2888 -2889  2890 -576 -2892 0
-2888 -2889  2890 -576  2893 0

c  -1+1 --> 0
c    ( b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0 ∧  p_576) -> (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧ -b^{1, 577}_0)
c  in CNF:
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_2
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_1
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_0
c  in DIMACS:
-2888  2889 -2890 -576 -2891 0
-2888  2889 -2890 -576 -2892 0
-2888  2889 -2890 -576 -2893 0

c  0+1 --> 1
c    (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧  p_576) -> (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0)
c  in CNF:
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_2
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_1
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨  b^{1, 577}_0
c  in DIMACS:
 2888  2889  2890 -576 -2891 0
 2888  2889  2890 -576 -2892 0
 2888  2889  2890 -576  2893 0

c  1+1 --> 2
c    (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0 ∧  p_576) -> (-b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0)
c  in CNF:
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_2
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨  b^{1, 577}_1
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ -p_576 ∨ -b^{1, 577}_0
c  in DIMACS:
 2888  2889 -2890 -576 -2891 0
 2888  2889 -2890 -576  2892 0
 2888  2889 -2890 -576 -2893 0

c  2+1 --> break 
c    (-b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧  p_576) -> break
c  in CNF:
c     b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 2888 -2889  2890 -576 1162 0


c  2-1 --> 1
c    (-b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧ -p_576) -> (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0)
c  in CNF:
c     b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_2
c     b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_1
c     b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨  b^{1, 577}_0
c  in DIMACS:
 2888 -2889  2890  576 -2891 0
 2888 -2889  2890  576 -2892 0
 2888 -2889  2890  576  2893 0

c  1-1 --> 0
c    (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0 ∧ -p_576) -> (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧ -b^{1, 577}_0)
c  in CNF:
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_2
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_1
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_0
c  in DIMACS:
 2888  2889 -2890  576 -2891 0
 2888  2889 -2890  576 -2892 0
 2888  2889 -2890  576 -2893 0

c  0-1 --> -1
c    (-b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧ -p_576) -> ( b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0)
c  in CNF:
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨  b^{1, 577}_2
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_1
c     b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨  b^{1, 577}_0
c  in DIMACS:
 2888  2889  2890  576  2891 0
 2888  2889  2890  576 -2892 0
 2888  2889  2890  576  2893 0

c  -1-1 --> -2
c    ( b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧  b^{1, 576}_0 ∧ -p_576) -> ( b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0)
c  in CNF:
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨  b^{1, 577}_2
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨  b^{1, 577}_1
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨  p_576 ∨ -b^{1, 577}_0
c  in DIMACS:
-2888  2889 -2890  576  2891 0
-2888  2889 -2890  576  2892 0
-2888  2889 -2890  576 -2893 0

c  -2-1 --> break 
c    ( b^{1, 576}_2 ∧  b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨  b^{1, 576}_0 ∨  p_576 ∨ break
c  in DIMACS:
-2888 -2889  2890  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 576}_2 ∧ -b^{1, 576}_1 ∧ -b^{1, 576}_0 ∧ true) 
c  in CNF:
c    -b^{1, 576}_2 ∨  b^{1, 576}_1 ∨  b^{1, 576}_0 ∨ false 
c  in DIMACS:
-2888  2889  2890  0

c  3 does not represent an automaton state.
c    -(-b^{1, 576}_2 ∧  b^{1, 576}_1 ∧  b^{1, 576}_0 ∧ true) 
c  in CNF:
c     b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ false 
c  in DIMACS:
 2888 -2889 -2890  0
c  -3 does not represent an automaton state.
c    -( b^{1, 576}_2 ∧  b^{1, 576}_1 ∧  b^{1, 576}_0 ∧ true) 
c  in CNF:
c    -b^{1, 576}_2 ∨ -b^{1, 576}_1 ∨ -b^{1, 576}_0 ∨ false 
c  in DIMACS:
-2888 -2889 -2890  0

c i = 577
c  -2+1 --> -1
c    ( b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧  p_577) -> ( b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0)
c  in CNF:
c    -b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨  b^{1, 578}_2
c    -b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_1
c    -b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨  b^{1, 578}_0
c  in DIMACS:
-2891 -2892  2893 -577  2894 0
-2891 -2892  2893 -577 -2895 0
-2891 -2892  2893 -577  2896 0

c  -1+1 --> 0
c    ( b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0 ∧  p_577) -> (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧ -b^{1, 578}_0)
c  in CNF:
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_2
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_1
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_0
c  in DIMACS:
-2891  2892 -2893 -577 -2894 0
-2891  2892 -2893 -577 -2895 0
-2891  2892 -2893 -577 -2896 0

c  0+1 --> 1
c    (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧  p_577) -> (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0)
c  in CNF:
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_2
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_1
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨  b^{1, 578}_0
c  in DIMACS:
 2891  2892  2893 -577 -2894 0
 2891  2892  2893 -577 -2895 0
 2891  2892  2893 -577  2896 0

c  1+1 --> 2
c    (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0 ∧  p_577) -> (-b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0)
c  in CNF:
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_2
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨  b^{1, 578}_1
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ -p_577 ∨ -b^{1, 578}_0
c  in DIMACS:
 2891  2892 -2893 -577 -2894 0
 2891  2892 -2893 -577  2895 0
 2891  2892 -2893 -577 -2896 0

c  2+1 --> break 
c    (-b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧  p_577) -> break
c  in CNF:
c     b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ -p_577 ∨ break
c  in DIMACS:
 2891 -2892  2893 -577 1162 0


c  2-1 --> 1
c    (-b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧ -p_577) -> (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0)
c  in CNF:
c     b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_2
c     b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_1
c     b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨  b^{1, 578}_0
c  in DIMACS:
 2891 -2892  2893  577 -2894 0
 2891 -2892  2893  577 -2895 0
 2891 -2892  2893  577  2896 0

c  1-1 --> 0
c    (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0 ∧ -p_577) -> (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧ -b^{1, 578}_0)
c  in CNF:
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_2
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_1
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_0
c  in DIMACS:
 2891  2892 -2893  577 -2894 0
 2891  2892 -2893  577 -2895 0
 2891  2892 -2893  577 -2896 0

c  0-1 --> -1
c    (-b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧ -p_577) -> ( b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0)
c  in CNF:
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨  b^{1, 578}_2
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_1
c     b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨  b^{1, 578}_0
c  in DIMACS:
 2891  2892  2893  577  2894 0
 2891  2892  2893  577 -2895 0
 2891  2892  2893  577  2896 0

c  -1-1 --> -2
c    ( b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧  b^{1, 577}_0 ∧ -p_577) -> ( b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0)
c  in CNF:
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨  b^{1, 578}_2
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨  b^{1, 578}_1
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨  p_577 ∨ -b^{1, 578}_0
c  in DIMACS:
-2891  2892 -2893  577  2894 0
-2891  2892 -2893  577  2895 0
-2891  2892 -2893  577 -2896 0

c  -2-1 --> break 
c    ( b^{1, 577}_2 ∧  b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧ -p_577) -> break
c  in CNF:
c    -b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨  b^{1, 577}_0 ∨  p_577 ∨ break
c  in DIMACS:
-2891 -2892  2893  577 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 577}_2 ∧ -b^{1, 577}_1 ∧ -b^{1, 577}_0 ∧ true) 
c  in CNF:
c    -b^{1, 577}_2 ∨  b^{1, 577}_1 ∨  b^{1, 577}_0 ∨ false 
c  in DIMACS:
-2891  2892  2893  0

c  3 does not represent an automaton state.
c    -(-b^{1, 577}_2 ∧  b^{1, 577}_1 ∧  b^{1, 577}_0 ∧ true) 
c  in CNF:
c     b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ false 
c  in DIMACS:
 2891 -2892 -2893  0
c  -3 does not represent an automaton state.
c    -( b^{1, 577}_2 ∧  b^{1, 577}_1 ∧  b^{1, 577}_0 ∧ true) 
c  in CNF:
c    -b^{1, 577}_2 ∨ -b^{1, 577}_1 ∨ -b^{1, 577}_0 ∨ false 
c  in DIMACS:
-2891 -2892 -2893  0

c i = 578
c  -2+1 --> -1
c    ( b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧  p_578) -> ( b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0)
c  in CNF:
c    -b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨  b^{1, 579}_2
c    -b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_1
c    -b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨  b^{1, 579}_0
c  in DIMACS:
-2894 -2895  2896 -578  2897 0
-2894 -2895  2896 -578 -2898 0
-2894 -2895  2896 -578  2899 0

c  -1+1 --> 0
c    ( b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0 ∧  p_578) -> (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧ -b^{1, 579}_0)
c  in CNF:
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_2
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_1
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_0
c  in DIMACS:
-2894  2895 -2896 -578 -2897 0
-2894  2895 -2896 -578 -2898 0
-2894  2895 -2896 -578 -2899 0

c  0+1 --> 1
c    (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧  p_578) -> (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0)
c  in CNF:
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_2
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_1
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨  b^{1, 579}_0
c  in DIMACS:
 2894  2895  2896 -578 -2897 0
 2894  2895  2896 -578 -2898 0
 2894  2895  2896 -578  2899 0

c  1+1 --> 2
c    (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0 ∧  p_578) -> (-b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0)
c  in CNF:
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_2
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨  b^{1, 579}_1
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ -p_578 ∨ -b^{1, 579}_0
c  in DIMACS:
 2894  2895 -2896 -578 -2897 0
 2894  2895 -2896 -578  2898 0
 2894  2895 -2896 -578 -2899 0

c  2+1 --> break 
c    (-b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧  p_578) -> break
c  in CNF:
c     b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ -p_578 ∨ break
c  in DIMACS:
 2894 -2895  2896 -578 1162 0


c  2-1 --> 1
c    (-b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧ -p_578) -> (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0)
c  in CNF:
c     b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_2
c     b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_1
c     b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨  b^{1, 579}_0
c  in DIMACS:
 2894 -2895  2896  578 -2897 0
 2894 -2895  2896  578 -2898 0
 2894 -2895  2896  578  2899 0

c  1-1 --> 0
c    (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0 ∧ -p_578) -> (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧ -b^{1, 579}_0)
c  in CNF:
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_2
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_1
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_0
c  in DIMACS:
 2894  2895 -2896  578 -2897 0
 2894  2895 -2896  578 -2898 0
 2894  2895 -2896  578 -2899 0

c  0-1 --> -1
c    (-b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧ -p_578) -> ( b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0)
c  in CNF:
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨  b^{1, 579}_2
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_1
c     b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨  b^{1, 579}_0
c  in DIMACS:
 2894  2895  2896  578  2897 0
 2894  2895  2896  578 -2898 0
 2894  2895  2896  578  2899 0

c  -1-1 --> -2
c    ( b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧  b^{1, 578}_0 ∧ -p_578) -> ( b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0)
c  in CNF:
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨  b^{1, 579}_2
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨  b^{1, 579}_1
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨  p_578 ∨ -b^{1, 579}_0
c  in DIMACS:
-2894  2895 -2896  578  2897 0
-2894  2895 -2896  578  2898 0
-2894  2895 -2896  578 -2899 0

c  -2-1 --> break 
c    ( b^{1, 578}_2 ∧  b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧ -p_578) -> break
c  in CNF:
c    -b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨  b^{1, 578}_0 ∨  p_578 ∨ break
c  in DIMACS:
-2894 -2895  2896  578 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 578}_2 ∧ -b^{1, 578}_1 ∧ -b^{1, 578}_0 ∧ true) 
c  in CNF:
c    -b^{1, 578}_2 ∨  b^{1, 578}_1 ∨  b^{1, 578}_0 ∨ false 
c  in DIMACS:
-2894  2895  2896  0

c  3 does not represent an automaton state.
c    -(-b^{1, 578}_2 ∧  b^{1, 578}_1 ∧  b^{1, 578}_0 ∧ true) 
c  in CNF:
c     b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ false 
c  in DIMACS:
 2894 -2895 -2896  0
c  -3 does not represent an automaton state.
c    -( b^{1, 578}_2 ∧  b^{1, 578}_1 ∧  b^{1, 578}_0 ∧ true) 
c  in CNF:
c    -b^{1, 578}_2 ∨ -b^{1, 578}_1 ∨ -b^{1, 578}_0 ∨ false 
c  in DIMACS:
-2894 -2895 -2896  0

c i = 579
c  -2+1 --> -1
c    ( b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧  p_579) -> ( b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0)
c  in CNF:
c    -b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨  b^{1, 580}_2
c    -b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_1
c    -b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨  b^{1, 580}_0
c  in DIMACS:
-2897 -2898  2899 -579  2900 0
-2897 -2898  2899 -579 -2901 0
-2897 -2898  2899 -579  2902 0

c  -1+1 --> 0
c    ( b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0 ∧  p_579) -> (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧ -b^{1, 580}_0)
c  in CNF:
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_2
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_1
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_0
c  in DIMACS:
-2897  2898 -2899 -579 -2900 0
-2897  2898 -2899 -579 -2901 0
-2897  2898 -2899 -579 -2902 0

c  0+1 --> 1
c    (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧  p_579) -> (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0)
c  in CNF:
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_2
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_1
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨  b^{1, 580}_0
c  in DIMACS:
 2897  2898  2899 -579 -2900 0
 2897  2898  2899 -579 -2901 0
 2897  2898  2899 -579  2902 0

c  1+1 --> 2
c    (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0 ∧  p_579) -> (-b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0)
c  in CNF:
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_2
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨  b^{1, 580}_1
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ -p_579 ∨ -b^{1, 580}_0
c  in DIMACS:
 2897  2898 -2899 -579 -2900 0
 2897  2898 -2899 -579  2901 0
 2897  2898 -2899 -579 -2902 0

c  2+1 --> break 
c    (-b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧  p_579) -> break
c  in CNF:
c     b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ -p_579 ∨ break
c  in DIMACS:
 2897 -2898  2899 -579 1162 0


c  2-1 --> 1
c    (-b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧ -p_579) -> (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0)
c  in CNF:
c     b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_2
c     b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_1
c     b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨  b^{1, 580}_0
c  in DIMACS:
 2897 -2898  2899  579 -2900 0
 2897 -2898  2899  579 -2901 0
 2897 -2898  2899  579  2902 0

c  1-1 --> 0
c    (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0 ∧ -p_579) -> (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧ -b^{1, 580}_0)
c  in CNF:
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_2
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_1
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_0
c  in DIMACS:
 2897  2898 -2899  579 -2900 0
 2897  2898 -2899  579 -2901 0
 2897  2898 -2899  579 -2902 0

c  0-1 --> -1
c    (-b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧ -p_579) -> ( b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0)
c  in CNF:
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨  b^{1, 580}_2
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_1
c     b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨  b^{1, 580}_0
c  in DIMACS:
 2897  2898  2899  579  2900 0
 2897  2898  2899  579 -2901 0
 2897  2898  2899  579  2902 0

c  -1-1 --> -2
c    ( b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧  b^{1, 579}_0 ∧ -p_579) -> ( b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0)
c  in CNF:
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨  b^{1, 580}_2
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨  b^{1, 580}_1
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨  p_579 ∨ -b^{1, 580}_0
c  in DIMACS:
-2897  2898 -2899  579  2900 0
-2897  2898 -2899  579  2901 0
-2897  2898 -2899  579 -2902 0

c  -2-1 --> break 
c    ( b^{1, 579}_2 ∧  b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧ -p_579) -> break
c  in CNF:
c    -b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨  b^{1, 579}_0 ∨  p_579 ∨ break
c  in DIMACS:
-2897 -2898  2899  579 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 579}_2 ∧ -b^{1, 579}_1 ∧ -b^{1, 579}_0 ∧ true) 
c  in CNF:
c    -b^{1, 579}_2 ∨  b^{1, 579}_1 ∨  b^{1, 579}_0 ∨ false 
c  in DIMACS:
-2897  2898  2899  0

c  3 does not represent an automaton state.
c    -(-b^{1, 579}_2 ∧  b^{1, 579}_1 ∧  b^{1, 579}_0 ∧ true) 
c  in CNF:
c     b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ false 
c  in DIMACS:
 2897 -2898 -2899  0
c  -3 does not represent an automaton state.
c    -( b^{1, 579}_2 ∧  b^{1, 579}_1 ∧  b^{1, 579}_0 ∧ true) 
c  in CNF:
c    -b^{1, 579}_2 ∨ -b^{1, 579}_1 ∨ -b^{1, 579}_0 ∨ false 
c  in DIMACS:
-2897 -2898 -2899  0

c i = 580
c  -2+1 --> -1
c    ( b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧  p_580) -> ( b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0)
c  in CNF:
c    -b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨  b^{1, 581}_2
c    -b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_1
c    -b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨  b^{1, 581}_0
c  in DIMACS:
-2900 -2901  2902 -580  2903 0
-2900 -2901  2902 -580 -2904 0
-2900 -2901  2902 -580  2905 0

c  -1+1 --> 0
c    ( b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0 ∧  p_580) -> (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧ -b^{1, 581}_0)
c  in CNF:
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_2
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_1
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_0
c  in DIMACS:
-2900  2901 -2902 -580 -2903 0
-2900  2901 -2902 -580 -2904 0
-2900  2901 -2902 -580 -2905 0

c  0+1 --> 1
c    (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧  p_580) -> (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0)
c  in CNF:
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_2
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_1
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨  b^{1, 581}_0
c  in DIMACS:
 2900  2901  2902 -580 -2903 0
 2900  2901  2902 -580 -2904 0
 2900  2901  2902 -580  2905 0

c  1+1 --> 2
c    (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0 ∧  p_580) -> (-b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0)
c  in CNF:
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_2
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨  b^{1, 581}_1
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ -p_580 ∨ -b^{1, 581}_0
c  in DIMACS:
 2900  2901 -2902 -580 -2903 0
 2900  2901 -2902 -580  2904 0
 2900  2901 -2902 -580 -2905 0

c  2+1 --> break 
c    (-b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧  p_580) -> break
c  in CNF:
c     b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 2900 -2901  2902 -580 1162 0


c  2-1 --> 1
c    (-b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧ -p_580) -> (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0)
c  in CNF:
c     b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_2
c     b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_1
c     b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨  b^{1, 581}_0
c  in DIMACS:
 2900 -2901  2902  580 -2903 0
 2900 -2901  2902  580 -2904 0
 2900 -2901  2902  580  2905 0

c  1-1 --> 0
c    (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0 ∧ -p_580) -> (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧ -b^{1, 581}_0)
c  in CNF:
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_2
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_1
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_0
c  in DIMACS:
 2900  2901 -2902  580 -2903 0
 2900  2901 -2902  580 -2904 0
 2900  2901 -2902  580 -2905 0

c  0-1 --> -1
c    (-b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧ -p_580) -> ( b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0)
c  in CNF:
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨  b^{1, 581}_2
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_1
c     b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨  b^{1, 581}_0
c  in DIMACS:
 2900  2901  2902  580  2903 0
 2900  2901  2902  580 -2904 0
 2900  2901  2902  580  2905 0

c  -1-1 --> -2
c    ( b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧  b^{1, 580}_0 ∧ -p_580) -> ( b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0)
c  in CNF:
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨  b^{1, 581}_2
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨  b^{1, 581}_1
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨  p_580 ∨ -b^{1, 581}_0
c  in DIMACS:
-2900  2901 -2902  580  2903 0
-2900  2901 -2902  580  2904 0
-2900  2901 -2902  580 -2905 0

c  -2-1 --> break 
c    ( b^{1, 580}_2 ∧  b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨  b^{1, 580}_0 ∨  p_580 ∨ break
c  in DIMACS:
-2900 -2901  2902  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 580}_2 ∧ -b^{1, 580}_1 ∧ -b^{1, 580}_0 ∧ true) 
c  in CNF:
c    -b^{1, 580}_2 ∨  b^{1, 580}_1 ∨  b^{1, 580}_0 ∨ false 
c  in DIMACS:
-2900  2901  2902  0

c  3 does not represent an automaton state.
c    -(-b^{1, 580}_2 ∧  b^{1, 580}_1 ∧  b^{1, 580}_0 ∧ true) 
c  in CNF:
c     b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ false 
c  in DIMACS:
 2900 -2901 -2902  0
c  -3 does not represent an automaton state.
c    -( b^{1, 580}_2 ∧  b^{1, 580}_1 ∧  b^{1, 580}_0 ∧ true) 
c  in CNF:
c    -b^{1, 580}_2 ∨ -b^{1, 580}_1 ∨ -b^{1, 580}_0 ∨ false 
c  in DIMACS:
-2900 -2901 -2902  0

c i = 581
c  -2+1 --> -1
c    ( b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧  p_581) -> ( b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0)
c  in CNF:
c    -b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨  b^{1, 582}_2
c    -b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_1
c    -b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨  b^{1, 582}_0
c  in DIMACS:
-2903 -2904  2905 -581  2906 0
-2903 -2904  2905 -581 -2907 0
-2903 -2904  2905 -581  2908 0

c  -1+1 --> 0
c    ( b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0 ∧  p_581) -> (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧ -b^{1, 582}_0)
c  in CNF:
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_2
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_1
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_0
c  in DIMACS:
-2903  2904 -2905 -581 -2906 0
-2903  2904 -2905 -581 -2907 0
-2903  2904 -2905 -581 -2908 0

c  0+1 --> 1
c    (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧  p_581) -> (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0)
c  in CNF:
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_2
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_1
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨  b^{1, 582}_0
c  in DIMACS:
 2903  2904  2905 -581 -2906 0
 2903  2904  2905 -581 -2907 0
 2903  2904  2905 -581  2908 0

c  1+1 --> 2
c    (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0 ∧  p_581) -> (-b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0)
c  in CNF:
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_2
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨  b^{1, 582}_1
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ -p_581 ∨ -b^{1, 582}_0
c  in DIMACS:
 2903  2904 -2905 -581 -2906 0
 2903  2904 -2905 -581  2907 0
 2903  2904 -2905 -581 -2908 0

c  2+1 --> break 
c    (-b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧  p_581) -> break
c  in CNF:
c     b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ -p_581 ∨ break
c  in DIMACS:
 2903 -2904  2905 -581 1162 0


c  2-1 --> 1
c    (-b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧ -p_581) -> (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0)
c  in CNF:
c     b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_2
c     b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_1
c     b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨  b^{1, 582}_0
c  in DIMACS:
 2903 -2904  2905  581 -2906 0
 2903 -2904  2905  581 -2907 0
 2903 -2904  2905  581  2908 0

c  1-1 --> 0
c    (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0 ∧ -p_581) -> (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧ -b^{1, 582}_0)
c  in CNF:
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_2
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_1
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_0
c  in DIMACS:
 2903  2904 -2905  581 -2906 0
 2903  2904 -2905  581 -2907 0
 2903  2904 -2905  581 -2908 0

c  0-1 --> -1
c    (-b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧ -p_581) -> ( b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0)
c  in CNF:
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨  b^{1, 582}_2
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_1
c     b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨  b^{1, 582}_0
c  in DIMACS:
 2903  2904  2905  581  2906 0
 2903  2904  2905  581 -2907 0
 2903  2904  2905  581  2908 0

c  -1-1 --> -2
c    ( b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧  b^{1, 581}_0 ∧ -p_581) -> ( b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0)
c  in CNF:
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨  b^{1, 582}_2
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨  b^{1, 582}_1
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨  p_581 ∨ -b^{1, 582}_0
c  in DIMACS:
-2903  2904 -2905  581  2906 0
-2903  2904 -2905  581  2907 0
-2903  2904 -2905  581 -2908 0

c  -2-1 --> break 
c    ( b^{1, 581}_2 ∧  b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧ -p_581) -> break
c  in CNF:
c    -b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨  b^{1, 581}_0 ∨  p_581 ∨ break
c  in DIMACS:
-2903 -2904  2905  581 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 581}_2 ∧ -b^{1, 581}_1 ∧ -b^{1, 581}_0 ∧ true) 
c  in CNF:
c    -b^{1, 581}_2 ∨  b^{1, 581}_1 ∨  b^{1, 581}_0 ∨ false 
c  in DIMACS:
-2903  2904  2905  0

c  3 does not represent an automaton state.
c    -(-b^{1, 581}_2 ∧  b^{1, 581}_1 ∧  b^{1, 581}_0 ∧ true) 
c  in CNF:
c     b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ false 
c  in DIMACS:
 2903 -2904 -2905  0
c  -3 does not represent an automaton state.
c    -( b^{1, 581}_2 ∧  b^{1, 581}_1 ∧  b^{1, 581}_0 ∧ true) 
c  in CNF:
c    -b^{1, 581}_2 ∨ -b^{1, 581}_1 ∨ -b^{1, 581}_0 ∨ false 
c  in DIMACS:
-2903 -2904 -2905  0

c i = 582
c  -2+1 --> -1
c    ( b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧  p_582) -> ( b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0)
c  in CNF:
c    -b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨  b^{1, 583}_2
c    -b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_1
c    -b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨  b^{1, 583}_0
c  in DIMACS:
-2906 -2907  2908 -582  2909 0
-2906 -2907  2908 -582 -2910 0
-2906 -2907  2908 -582  2911 0

c  -1+1 --> 0
c    ( b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0 ∧  p_582) -> (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧ -b^{1, 583}_0)
c  in CNF:
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_2
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_1
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_0
c  in DIMACS:
-2906  2907 -2908 -582 -2909 0
-2906  2907 -2908 -582 -2910 0
-2906  2907 -2908 -582 -2911 0

c  0+1 --> 1
c    (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧  p_582) -> (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0)
c  in CNF:
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_2
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_1
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨  b^{1, 583}_0
c  in DIMACS:
 2906  2907  2908 -582 -2909 0
 2906  2907  2908 -582 -2910 0
 2906  2907  2908 -582  2911 0

c  1+1 --> 2
c    (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0 ∧  p_582) -> (-b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0)
c  in CNF:
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_2
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨  b^{1, 583}_1
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ -p_582 ∨ -b^{1, 583}_0
c  in DIMACS:
 2906  2907 -2908 -582 -2909 0
 2906  2907 -2908 -582  2910 0
 2906  2907 -2908 -582 -2911 0

c  2+1 --> break 
c    (-b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧  p_582) -> break
c  in CNF:
c     b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 2906 -2907  2908 -582 1162 0


c  2-1 --> 1
c    (-b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧ -p_582) -> (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0)
c  in CNF:
c     b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_2
c     b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_1
c     b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨  b^{1, 583}_0
c  in DIMACS:
 2906 -2907  2908  582 -2909 0
 2906 -2907  2908  582 -2910 0
 2906 -2907  2908  582  2911 0

c  1-1 --> 0
c    (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0 ∧ -p_582) -> (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧ -b^{1, 583}_0)
c  in CNF:
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_2
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_1
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_0
c  in DIMACS:
 2906  2907 -2908  582 -2909 0
 2906  2907 -2908  582 -2910 0
 2906  2907 -2908  582 -2911 0

c  0-1 --> -1
c    (-b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧ -p_582) -> ( b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0)
c  in CNF:
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨  b^{1, 583}_2
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_1
c     b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨  b^{1, 583}_0
c  in DIMACS:
 2906  2907  2908  582  2909 0
 2906  2907  2908  582 -2910 0
 2906  2907  2908  582  2911 0

c  -1-1 --> -2
c    ( b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧  b^{1, 582}_0 ∧ -p_582) -> ( b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0)
c  in CNF:
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨  b^{1, 583}_2
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨  b^{1, 583}_1
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨  p_582 ∨ -b^{1, 583}_0
c  in DIMACS:
-2906  2907 -2908  582  2909 0
-2906  2907 -2908  582  2910 0
-2906  2907 -2908  582 -2911 0

c  -2-1 --> break 
c    ( b^{1, 582}_2 ∧  b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨  b^{1, 582}_0 ∨  p_582 ∨ break
c  in DIMACS:
-2906 -2907  2908  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 582}_2 ∧ -b^{1, 582}_1 ∧ -b^{1, 582}_0 ∧ true) 
c  in CNF:
c    -b^{1, 582}_2 ∨  b^{1, 582}_1 ∨  b^{1, 582}_0 ∨ false 
c  in DIMACS:
-2906  2907  2908  0

c  3 does not represent an automaton state.
c    -(-b^{1, 582}_2 ∧  b^{1, 582}_1 ∧  b^{1, 582}_0 ∧ true) 
c  in CNF:
c     b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ false 
c  in DIMACS:
 2906 -2907 -2908  0
c  -3 does not represent an automaton state.
c    -( b^{1, 582}_2 ∧  b^{1, 582}_1 ∧  b^{1, 582}_0 ∧ true) 
c  in CNF:
c    -b^{1, 582}_2 ∨ -b^{1, 582}_1 ∨ -b^{1, 582}_0 ∨ false 
c  in DIMACS:
-2906 -2907 -2908  0

c i = 583
c  -2+1 --> -1
c    ( b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧  p_583) -> ( b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0)
c  in CNF:
c    -b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨  b^{1, 584}_2
c    -b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_1
c    -b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨  b^{1, 584}_0
c  in DIMACS:
-2909 -2910  2911 -583  2912 0
-2909 -2910  2911 -583 -2913 0
-2909 -2910  2911 -583  2914 0

c  -1+1 --> 0
c    ( b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0 ∧  p_583) -> (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧ -b^{1, 584}_0)
c  in CNF:
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_2
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_1
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_0
c  in DIMACS:
-2909  2910 -2911 -583 -2912 0
-2909  2910 -2911 -583 -2913 0
-2909  2910 -2911 -583 -2914 0

c  0+1 --> 1
c    (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧  p_583) -> (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0)
c  in CNF:
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_2
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_1
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨  b^{1, 584}_0
c  in DIMACS:
 2909  2910  2911 -583 -2912 0
 2909  2910  2911 -583 -2913 0
 2909  2910  2911 -583  2914 0

c  1+1 --> 2
c    (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0 ∧  p_583) -> (-b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0)
c  in CNF:
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_2
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨  b^{1, 584}_1
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ -p_583 ∨ -b^{1, 584}_0
c  in DIMACS:
 2909  2910 -2911 -583 -2912 0
 2909  2910 -2911 -583  2913 0
 2909  2910 -2911 -583 -2914 0

c  2+1 --> break 
c    (-b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧  p_583) -> break
c  in CNF:
c     b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ -p_583 ∨ break
c  in DIMACS:
 2909 -2910  2911 -583 1162 0


c  2-1 --> 1
c    (-b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧ -p_583) -> (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0)
c  in CNF:
c     b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_2
c     b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_1
c     b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨  b^{1, 584}_0
c  in DIMACS:
 2909 -2910  2911  583 -2912 0
 2909 -2910  2911  583 -2913 0
 2909 -2910  2911  583  2914 0

c  1-1 --> 0
c    (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0 ∧ -p_583) -> (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧ -b^{1, 584}_0)
c  in CNF:
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_2
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_1
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_0
c  in DIMACS:
 2909  2910 -2911  583 -2912 0
 2909  2910 -2911  583 -2913 0
 2909  2910 -2911  583 -2914 0

c  0-1 --> -1
c    (-b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧ -p_583) -> ( b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0)
c  in CNF:
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨  b^{1, 584}_2
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_1
c     b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨  b^{1, 584}_0
c  in DIMACS:
 2909  2910  2911  583  2912 0
 2909  2910  2911  583 -2913 0
 2909  2910  2911  583  2914 0

c  -1-1 --> -2
c    ( b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧  b^{1, 583}_0 ∧ -p_583) -> ( b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0)
c  in CNF:
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨  b^{1, 584}_2
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨  b^{1, 584}_1
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨  p_583 ∨ -b^{1, 584}_0
c  in DIMACS:
-2909  2910 -2911  583  2912 0
-2909  2910 -2911  583  2913 0
-2909  2910 -2911  583 -2914 0

c  -2-1 --> break 
c    ( b^{1, 583}_2 ∧  b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧ -p_583) -> break
c  in CNF:
c    -b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨  b^{1, 583}_0 ∨  p_583 ∨ break
c  in DIMACS:
-2909 -2910  2911  583 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 583}_2 ∧ -b^{1, 583}_1 ∧ -b^{1, 583}_0 ∧ true) 
c  in CNF:
c    -b^{1, 583}_2 ∨  b^{1, 583}_1 ∨  b^{1, 583}_0 ∨ false 
c  in DIMACS:
-2909  2910  2911  0

c  3 does not represent an automaton state.
c    -(-b^{1, 583}_2 ∧  b^{1, 583}_1 ∧  b^{1, 583}_0 ∧ true) 
c  in CNF:
c     b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ false 
c  in DIMACS:
 2909 -2910 -2911  0
c  -3 does not represent an automaton state.
c    -( b^{1, 583}_2 ∧  b^{1, 583}_1 ∧  b^{1, 583}_0 ∧ true) 
c  in CNF:
c    -b^{1, 583}_2 ∨ -b^{1, 583}_1 ∨ -b^{1, 583}_0 ∨ false 
c  in DIMACS:
-2909 -2910 -2911  0

c i = 584
c  -2+1 --> -1
c    ( b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧  p_584) -> ( b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0)
c  in CNF:
c    -b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨  b^{1, 585}_2
c    -b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_1
c    -b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨  b^{1, 585}_0
c  in DIMACS:
-2912 -2913  2914 -584  2915 0
-2912 -2913  2914 -584 -2916 0
-2912 -2913  2914 -584  2917 0

c  -1+1 --> 0
c    ( b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0 ∧  p_584) -> (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧ -b^{1, 585}_0)
c  in CNF:
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_2
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_1
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_0
c  in DIMACS:
-2912  2913 -2914 -584 -2915 0
-2912  2913 -2914 -584 -2916 0
-2912  2913 -2914 -584 -2917 0

c  0+1 --> 1
c    (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧  p_584) -> (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0)
c  in CNF:
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_2
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_1
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨  b^{1, 585}_0
c  in DIMACS:
 2912  2913  2914 -584 -2915 0
 2912  2913  2914 -584 -2916 0
 2912  2913  2914 -584  2917 0

c  1+1 --> 2
c    (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0 ∧  p_584) -> (-b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0)
c  in CNF:
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_2
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨  b^{1, 585}_1
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ -p_584 ∨ -b^{1, 585}_0
c  in DIMACS:
 2912  2913 -2914 -584 -2915 0
 2912  2913 -2914 -584  2916 0
 2912  2913 -2914 -584 -2917 0

c  2+1 --> break 
c    (-b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧  p_584) -> break
c  in CNF:
c     b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 2912 -2913  2914 -584 1162 0


c  2-1 --> 1
c    (-b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧ -p_584) -> (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0)
c  in CNF:
c     b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_2
c     b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_1
c     b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨  b^{1, 585}_0
c  in DIMACS:
 2912 -2913  2914  584 -2915 0
 2912 -2913  2914  584 -2916 0
 2912 -2913  2914  584  2917 0

c  1-1 --> 0
c    (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0 ∧ -p_584) -> (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧ -b^{1, 585}_0)
c  in CNF:
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_2
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_1
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_0
c  in DIMACS:
 2912  2913 -2914  584 -2915 0
 2912  2913 -2914  584 -2916 0
 2912  2913 -2914  584 -2917 0

c  0-1 --> -1
c    (-b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧ -p_584) -> ( b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0)
c  in CNF:
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨  b^{1, 585}_2
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_1
c     b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨  b^{1, 585}_0
c  in DIMACS:
 2912  2913  2914  584  2915 0
 2912  2913  2914  584 -2916 0
 2912  2913  2914  584  2917 0

c  -1-1 --> -2
c    ( b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧  b^{1, 584}_0 ∧ -p_584) -> ( b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0)
c  in CNF:
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨  b^{1, 585}_2
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨  b^{1, 585}_1
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨  p_584 ∨ -b^{1, 585}_0
c  in DIMACS:
-2912  2913 -2914  584  2915 0
-2912  2913 -2914  584  2916 0
-2912  2913 -2914  584 -2917 0

c  -2-1 --> break 
c    ( b^{1, 584}_2 ∧  b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨  b^{1, 584}_0 ∨  p_584 ∨ break
c  in DIMACS:
-2912 -2913  2914  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 584}_2 ∧ -b^{1, 584}_1 ∧ -b^{1, 584}_0 ∧ true) 
c  in CNF:
c    -b^{1, 584}_2 ∨  b^{1, 584}_1 ∨  b^{1, 584}_0 ∨ false 
c  in DIMACS:
-2912  2913  2914  0

c  3 does not represent an automaton state.
c    -(-b^{1, 584}_2 ∧  b^{1, 584}_1 ∧  b^{1, 584}_0 ∧ true) 
c  in CNF:
c     b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ false 
c  in DIMACS:
 2912 -2913 -2914  0
c  -3 does not represent an automaton state.
c    -( b^{1, 584}_2 ∧  b^{1, 584}_1 ∧  b^{1, 584}_0 ∧ true) 
c  in CNF:
c    -b^{1, 584}_2 ∨ -b^{1, 584}_1 ∨ -b^{1, 584}_0 ∨ false 
c  in DIMACS:
-2912 -2913 -2914  0

c i = 585
c  -2+1 --> -1
c    ( b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧  p_585) -> ( b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0)
c  in CNF:
c    -b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨  b^{1, 586}_2
c    -b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_1
c    -b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨  b^{1, 586}_0
c  in DIMACS:
-2915 -2916  2917 -585  2918 0
-2915 -2916  2917 -585 -2919 0
-2915 -2916  2917 -585  2920 0

c  -1+1 --> 0
c    ( b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0 ∧  p_585) -> (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧ -b^{1, 586}_0)
c  in CNF:
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_2
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_1
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_0
c  in DIMACS:
-2915  2916 -2917 -585 -2918 0
-2915  2916 -2917 -585 -2919 0
-2915  2916 -2917 -585 -2920 0

c  0+1 --> 1
c    (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧  p_585) -> (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0)
c  in CNF:
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_2
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_1
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨  b^{1, 586}_0
c  in DIMACS:
 2915  2916  2917 -585 -2918 0
 2915  2916  2917 -585 -2919 0
 2915  2916  2917 -585  2920 0

c  1+1 --> 2
c    (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0 ∧  p_585) -> (-b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0)
c  in CNF:
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_2
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨  b^{1, 586}_1
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ -p_585 ∨ -b^{1, 586}_0
c  in DIMACS:
 2915  2916 -2917 -585 -2918 0
 2915  2916 -2917 -585  2919 0
 2915  2916 -2917 -585 -2920 0

c  2+1 --> break 
c    (-b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧  p_585) -> break
c  in CNF:
c     b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 2915 -2916  2917 -585 1162 0


c  2-1 --> 1
c    (-b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧ -p_585) -> (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0)
c  in CNF:
c     b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_2
c     b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_1
c     b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨  b^{1, 586}_0
c  in DIMACS:
 2915 -2916  2917  585 -2918 0
 2915 -2916  2917  585 -2919 0
 2915 -2916  2917  585  2920 0

c  1-1 --> 0
c    (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0 ∧ -p_585) -> (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧ -b^{1, 586}_0)
c  in CNF:
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_2
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_1
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_0
c  in DIMACS:
 2915  2916 -2917  585 -2918 0
 2915  2916 -2917  585 -2919 0
 2915  2916 -2917  585 -2920 0

c  0-1 --> -1
c    (-b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧ -p_585) -> ( b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0)
c  in CNF:
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨  b^{1, 586}_2
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_1
c     b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨  b^{1, 586}_0
c  in DIMACS:
 2915  2916  2917  585  2918 0
 2915  2916  2917  585 -2919 0
 2915  2916  2917  585  2920 0

c  -1-1 --> -2
c    ( b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧  b^{1, 585}_0 ∧ -p_585) -> ( b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0)
c  in CNF:
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨  b^{1, 586}_2
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨  b^{1, 586}_1
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨  p_585 ∨ -b^{1, 586}_0
c  in DIMACS:
-2915  2916 -2917  585  2918 0
-2915  2916 -2917  585  2919 0
-2915  2916 -2917  585 -2920 0

c  -2-1 --> break 
c    ( b^{1, 585}_2 ∧  b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨  b^{1, 585}_0 ∨  p_585 ∨ break
c  in DIMACS:
-2915 -2916  2917  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 585}_2 ∧ -b^{1, 585}_1 ∧ -b^{1, 585}_0 ∧ true) 
c  in CNF:
c    -b^{1, 585}_2 ∨  b^{1, 585}_1 ∨  b^{1, 585}_0 ∨ false 
c  in DIMACS:
-2915  2916  2917  0

c  3 does not represent an automaton state.
c    -(-b^{1, 585}_2 ∧  b^{1, 585}_1 ∧  b^{1, 585}_0 ∧ true) 
c  in CNF:
c     b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ false 
c  in DIMACS:
 2915 -2916 -2917  0
c  -3 does not represent an automaton state.
c    -( b^{1, 585}_2 ∧  b^{1, 585}_1 ∧  b^{1, 585}_0 ∧ true) 
c  in CNF:
c    -b^{1, 585}_2 ∨ -b^{1, 585}_1 ∨ -b^{1, 585}_0 ∨ false 
c  in DIMACS:
-2915 -2916 -2917  0

c i = 586
c  -2+1 --> -1
c    ( b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧  p_586) -> ( b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0)
c  in CNF:
c    -b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨  b^{1, 587}_2
c    -b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_1
c    -b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨  b^{1, 587}_0
c  in DIMACS:
-2918 -2919  2920 -586  2921 0
-2918 -2919  2920 -586 -2922 0
-2918 -2919  2920 -586  2923 0

c  -1+1 --> 0
c    ( b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0 ∧  p_586) -> (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧ -b^{1, 587}_0)
c  in CNF:
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_2
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_1
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_0
c  in DIMACS:
-2918  2919 -2920 -586 -2921 0
-2918  2919 -2920 -586 -2922 0
-2918  2919 -2920 -586 -2923 0

c  0+1 --> 1
c    (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧  p_586) -> (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0)
c  in CNF:
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_2
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_1
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨  b^{1, 587}_0
c  in DIMACS:
 2918  2919  2920 -586 -2921 0
 2918  2919  2920 -586 -2922 0
 2918  2919  2920 -586  2923 0

c  1+1 --> 2
c    (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0 ∧  p_586) -> (-b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0)
c  in CNF:
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_2
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨  b^{1, 587}_1
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ -p_586 ∨ -b^{1, 587}_0
c  in DIMACS:
 2918  2919 -2920 -586 -2921 0
 2918  2919 -2920 -586  2922 0
 2918  2919 -2920 -586 -2923 0

c  2+1 --> break 
c    (-b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧  p_586) -> break
c  in CNF:
c     b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ -p_586 ∨ break
c  in DIMACS:
 2918 -2919  2920 -586 1162 0


c  2-1 --> 1
c    (-b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧ -p_586) -> (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0)
c  in CNF:
c     b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_2
c     b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_1
c     b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨  b^{1, 587}_0
c  in DIMACS:
 2918 -2919  2920  586 -2921 0
 2918 -2919  2920  586 -2922 0
 2918 -2919  2920  586  2923 0

c  1-1 --> 0
c    (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0 ∧ -p_586) -> (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧ -b^{1, 587}_0)
c  in CNF:
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_2
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_1
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_0
c  in DIMACS:
 2918  2919 -2920  586 -2921 0
 2918  2919 -2920  586 -2922 0
 2918  2919 -2920  586 -2923 0

c  0-1 --> -1
c    (-b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧ -p_586) -> ( b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0)
c  in CNF:
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨  b^{1, 587}_2
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_1
c     b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨  b^{1, 587}_0
c  in DIMACS:
 2918  2919  2920  586  2921 0
 2918  2919  2920  586 -2922 0
 2918  2919  2920  586  2923 0

c  -1-1 --> -2
c    ( b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧  b^{1, 586}_0 ∧ -p_586) -> ( b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0)
c  in CNF:
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨  b^{1, 587}_2
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨  b^{1, 587}_1
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨  p_586 ∨ -b^{1, 587}_0
c  in DIMACS:
-2918  2919 -2920  586  2921 0
-2918  2919 -2920  586  2922 0
-2918  2919 -2920  586 -2923 0

c  -2-1 --> break 
c    ( b^{1, 586}_2 ∧  b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧ -p_586) -> break
c  in CNF:
c    -b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨  b^{1, 586}_0 ∨  p_586 ∨ break
c  in DIMACS:
-2918 -2919  2920  586 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 586}_2 ∧ -b^{1, 586}_1 ∧ -b^{1, 586}_0 ∧ true) 
c  in CNF:
c    -b^{1, 586}_2 ∨  b^{1, 586}_1 ∨  b^{1, 586}_0 ∨ false 
c  in DIMACS:
-2918  2919  2920  0

c  3 does not represent an automaton state.
c    -(-b^{1, 586}_2 ∧  b^{1, 586}_1 ∧  b^{1, 586}_0 ∧ true) 
c  in CNF:
c     b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ false 
c  in DIMACS:
 2918 -2919 -2920  0
c  -3 does not represent an automaton state.
c    -( b^{1, 586}_2 ∧  b^{1, 586}_1 ∧  b^{1, 586}_0 ∧ true) 
c  in CNF:
c    -b^{1, 586}_2 ∨ -b^{1, 586}_1 ∨ -b^{1, 586}_0 ∨ false 
c  in DIMACS:
-2918 -2919 -2920  0

c i = 587
c  -2+1 --> -1
c    ( b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧  p_587) -> ( b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0)
c  in CNF:
c    -b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨  b^{1, 588}_2
c    -b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_1
c    -b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨  b^{1, 588}_0
c  in DIMACS:
-2921 -2922  2923 -587  2924 0
-2921 -2922  2923 -587 -2925 0
-2921 -2922  2923 -587  2926 0

c  -1+1 --> 0
c    ( b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0 ∧  p_587) -> (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧ -b^{1, 588}_0)
c  in CNF:
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_2
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_1
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_0
c  in DIMACS:
-2921  2922 -2923 -587 -2924 0
-2921  2922 -2923 -587 -2925 0
-2921  2922 -2923 -587 -2926 0

c  0+1 --> 1
c    (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧  p_587) -> (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0)
c  in CNF:
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_2
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_1
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨  b^{1, 588}_0
c  in DIMACS:
 2921  2922  2923 -587 -2924 0
 2921  2922  2923 -587 -2925 0
 2921  2922  2923 -587  2926 0

c  1+1 --> 2
c    (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0 ∧  p_587) -> (-b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0)
c  in CNF:
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_2
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨  b^{1, 588}_1
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ -p_587 ∨ -b^{1, 588}_0
c  in DIMACS:
 2921  2922 -2923 -587 -2924 0
 2921  2922 -2923 -587  2925 0
 2921  2922 -2923 -587 -2926 0

c  2+1 --> break 
c    (-b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧  p_587) -> break
c  in CNF:
c     b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ -p_587 ∨ break
c  in DIMACS:
 2921 -2922  2923 -587 1162 0


c  2-1 --> 1
c    (-b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧ -p_587) -> (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0)
c  in CNF:
c     b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_2
c     b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_1
c     b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨  b^{1, 588}_0
c  in DIMACS:
 2921 -2922  2923  587 -2924 0
 2921 -2922  2923  587 -2925 0
 2921 -2922  2923  587  2926 0

c  1-1 --> 0
c    (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0 ∧ -p_587) -> (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧ -b^{1, 588}_0)
c  in CNF:
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_2
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_1
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_0
c  in DIMACS:
 2921  2922 -2923  587 -2924 0
 2921  2922 -2923  587 -2925 0
 2921  2922 -2923  587 -2926 0

c  0-1 --> -1
c    (-b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧ -p_587) -> ( b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0)
c  in CNF:
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨  b^{1, 588}_2
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_1
c     b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨  b^{1, 588}_0
c  in DIMACS:
 2921  2922  2923  587  2924 0
 2921  2922  2923  587 -2925 0
 2921  2922  2923  587  2926 0

c  -1-1 --> -2
c    ( b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧  b^{1, 587}_0 ∧ -p_587) -> ( b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0)
c  in CNF:
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨  b^{1, 588}_2
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨  b^{1, 588}_1
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨  p_587 ∨ -b^{1, 588}_0
c  in DIMACS:
-2921  2922 -2923  587  2924 0
-2921  2922 -2923  587  2925 0
-2921  2922 -2923  587 -2926 0

c  -2-1 --> break 
c    ( b^{1, 587}_2 ∧  b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧ -p_587) -> break
c  in CNF:
c    -b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨  b^{1, 587}_0 ∨  p_587 ∨ break
c  in DIMACS:
-2921 -2922  2923  587 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 587}_2 ∧ -b^{1, 587}_1 ∧ -b^{1, 587}_0 ∧ true) 
c  in CNF:
c    -b^{1, 587}_2 ∨  b^{1, 587}_1 ∨  b^{1, 587}_0 ∨ false 
c  in DIMACS:
-2921  2922  2923  0

c  3 does not represent an automaton state.
c    -(-b^{1, 587}_2 ∧  b^{1, 587}_1 ∧  b^{1, 587}_0 ∧ true) 
c  in CNF:
c     b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ false 
c  in DIMACS:
 2921 -2922 -2923  0
c  -3 does not represent an automaton state.
c    -( b^{1, 587}_2 ∧  b^{1, 587}_1 ∧  b^{1, 587}_0 ∧ true) 
c  in CNF:
c    -b^{1, 587}_2 ∨ -b^{1, 587}_1 ∨ -b^{1, 587}_0 ∨ false 
c  in DIMACS:
-2921 -2922 -2923  0

c i = 588
c  -2+1 --> -1
c    ( b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧  p_588) -> ( b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0)
c  in CNF:
c    -b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨  b^{1, 589}_2
c    -b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_1
c    -b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨  b^{1, 589}_0
c  in DIMACS:
-2924 -2925  2926 -588  2927 0
-2924 -2925  2926 -588 -2928 0
-2924 -2925  2926 -588  2929 0

c  -1+1 --> 0
c    ( b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0 ∧  p_588) -> (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧ -b^{1, 589}_0)
c  in CNF:
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_2
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_1
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_0
c  in DIMACS:
-2924  2925 -2926 -588 -2927 0
-2924  2925 -2926 -588 -2928 0
-2924  2925 -2926 -588 -2929 0

c  0+1 --> 1
c    (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧  p_588) -> (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0)
c  in CNF:
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_2
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_1
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨  b^{1, 589}_0
c  in DIMACS:
 2924  2925  2926 -588 -2927 0
 2924  2925  2926 -588 -2928 0
 2924  2925  2926 -588  2929 0

c  1+1 --> 2
c    (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0 ∧  p_588) -> (-b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0)
c  in CNF:
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_2
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨  b^{1, 589}_1
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ -p_588 ∨ -b^{1, 589}_0
c  in DIMACS:
 2924  2925 -2926 -588 -2927 0
 2924  2925 -2926 -588  2928 0
 2924  2925 -2926 -588 -2929 0

c  2+1 --> break 
c    (-b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧  p_588) -> break
c  in CNF:
c     b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 2924 -2925  2926 -588 1162 0


c  2-1 --> 1
c    (-b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧ -p_588) -> (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0)
c  in CNF:
c     b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_2
c     b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_1
c     b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨  b^{1, 589}_0
c  in DIMACS:
 2924 -2925  2926  588 -2927 0
 2924 -2925  2926  588 -2928 0
 2924 -2925  2926  588  2929 0

c  1-1 --> 0
c    (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0 ∧ -p_588) -> (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧ -b^{1, 589}_0)
c  in CNF:
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_2
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_1
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_0
c  in DIMACS:
 2924  2925 -2926  588 -2927 0
 2924  2925 -2926  588 -2928 0
 2924  2925 -2926  588 -2929 0

c  0-1 --> -1
c    (-b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧ -p_588) -> ( b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0)
c  in CNF:
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨  b^{1, 589}_2
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_1
c     b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨  b^{1, 589}_0
c  in DIMACS:
 2924  2925  2926  588  2927 0
 2924  2925  2926  588 -2928 0
 2924  2925  2926  588  2929 0

c  -1-1 --> -2
c    ( b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧  b^{1, 588}_0 ∧ -p_588) -> ( b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0)
c  in CNF:
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨  b^{1, 589}_2
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨  b^{1, 589}_1
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨  p_588 ∨ -b^{1, 589}_0
c  in DIMACS:
-2924  2925 -2926  588  2927 0
-2924  2925 -2926  588  2928 0
-2924  2925 -2926  588 -2929 0

c  -2-1 --> break 
c    ( b^{1, 588}_2 ∧  b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨  b^{1, 588}_0 ∨  p_588 ∨ break
c  in DIMACS:
-2924 -2925  2926  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 588}_2 ∧ -b^{1, 588}_1 ∧ -b^{1, 588}_0 ∧ true) 
c  in CNF:
c    -b^{1, 588}_2 ∨  b^{1, 588}_1 ∨  b^{1, 588}_0 ∨ false 
c  in DIMACS:
-2924  2925  2926  0

c  3 does not represent an automaton state.
c    -(-b^{1, 588}_2 ∧  b^{1, 588}_1 ∧  b^{1, 588}_0 ∧ true) 
c  in CNF:
c     b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ false 
c  in DIMACS:
 2924 -2925 -2926  0
c  -3 does not represent an automaton state.
c    -( b^{1, 588}_2 ∧  b^{1, 588}_1 ∧  b^{1, 588}_0 ∧ true) 
c  in CNF:
c    -b^{1, 588}_2 ∨ -b^{1, 588}_1 ∨ -b^{1, 588}_0 ∨ false 
c  in DIMACS:
-2924 -2925 -2926  0

c i = 589
c  -2+1 --> -1
c    ( b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧  p_589) -> ( b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0)
c  in CNF:
c    -b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨  b^{1, 590}_2
c    -b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_1
c    -b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨  b^{1, 590}_0
c  in DIMACS:
-2927 -2928  2929 -589  2930 0
-2927 -2928  2929 -589 -2931 0
-2927 -2928  2929 -589  2932 0

c  -1+1 --> 0
c    ( b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0 ∧  p_589) -> (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧ -b^{1, 590}_0)
c  in CNF:
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_2
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_1
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_0
c  in DIMACS:
-2927  2928 -2929 -589 -2930 0
-2927  2928 -2929 -589 -2931 0
-2927  2928 -2929 -589 -2932 0

c  0+1 --> 1
c    (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧  p_589) -> (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0)
c  in CNF:
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_2
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_1
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨  b^{1, 590}_0
c  in DIMACS:
 2927  2928  2929 -589 -2930 0
 2927  2928  2929 -589 -2931 0
 2927  2928  2929 -589  2932 0

c  1+1 --> 2
c    (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0 ∧  p_589) -> (-b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0)
c  in CNF:
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_2
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨  b^{1, 590}_1
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ -p_589 ∨ -b^{1, 590}_0
c  in DIMACS:
 2927  2928 -2929 -589 -2930 0
 2927  2928 -2929 -589  2931 0
 2927  2928 -2929 -589 -2932 0

c  2+1 --> break 
c    (-b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧  p_589) -> break
c  in CNF:
c     b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ -p_589 ∨ break
c  in DIMACS:
 2927 -2928  2929 -589 1162 0


c  2-1 --> 1
c    (-b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧ -p_589) -> (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0)
c  in CNF:
c     b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_2
c     b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_1
c     b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨  b^{1, 590}_0
c  in DIMACS:
 2927 -2928  2929  589 -2930 0
 2927 -2928  2929  589 -2931 0
 2927 -2928  2929  589  2932 0

c  1-1 --> 0
c    (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0 ∧ -p_589) -> (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧ -b^{1, 590}_0)
c  in CNF:
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_2
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_1
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_0
c  in DIMACS:
 2927  2928 -2929  589 -2930 0
 2927  2928 -2929  589 -2931 0
 2927  2928 -2929  589 -2932 0

c  0-1 --> -1
c    (-b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧ -p_589) -> ( b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0)
c  in CNF:
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨  b^{1, 590}_2
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_1
c     b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨  b^{1, 590}_0
c  in DIMACS:
 2927  2928  2929  589  2930 0
 2927  2928  2929  589 -2931 0
 2927  2928  2929  589  2932 0

c  -1-1 --> -2
c    ( b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧  b^{1, 589}_0 ∧ -p_589) -> ( b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0)
c  in CNF:
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨  b^{1, 590}_2
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨  b^{1, 590}_1
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨  p_589 ∨ -b^{1, 590}_0
c  in DIMACS:
-2927  2928 -2929  589  2930 0
-2927  2928 -2929  589  2931 0
-2927  2928 -2929  589 -2932 0

c  -2-1 --> break 
c    ( b^{1, 589}_2 ∧  b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧ -p_589) -> break
c  in CNF:
c    -b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨  b^{1, 589}_0 ∨  p_589 ∨ break
c  in DIMACS:
-2927 -2928  2929  589 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 589}_2 ∧ -b^{1, 589}_1 ∧ -b^{1, 589}_0 ∧ true) 
c  in CNF:
c    -b^{1, 589}_2 ∨  b^{1, 589}_1 ∨  b^{1, 589}_0 ∨ false 
c  in DIMACS:
-2927  2928  2929  0

c  3 does not represent an automaton state.
c    -(-b^{1, 589}_2 ∧  b^{1, 589}_1 ∧  b^{1, 589}_0 ∧ true) 
c  in CNF:
c     b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ false 
c  in DIMACS:
 2927 -2928 -2929  0
c  -3 does not represent an automaton state.
c    -( b^{1, 589}_2 ∧  b^{1, 589}_1 ∧  b^{1, 589}_0 ∧ true) 
c  in CNF:
c    -b^{1, 589}_2 ∨ -b^{1, 589}_1 ∨ -b^{1, 589}_0 ∨ false 
c  in DIMACS:
-2927 -2928 -2929  0

c i = 590
c  -2+1 --> -1
c    ( b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧  p_590) -> ( b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0)
c  in CNF:
c    -b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨  b^{1, 591}_2
c    -b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_1
c    -b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨  b^{1, 591}_0
c  in DIMACS:
-2930 -2931  2932 -590  2933 0
-2930 -2931  2932 -590 -2934 0
-2930 -2931  2932 -590  2935 0

c  -1+1 --> 0
c    ( b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0 ∧  p_590) -> (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧ -b^{1, 591}_0)
c  in CNF:
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_2
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_1
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_0
c  in DIMACS:
-2930  2931 -2932 -590 -2933 0
-2930  2931 -2932 -590 -2934 0
-2930  2931 -2932 -590 -2935 0

c  0+1 --> 1
c    (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧  p_590) -> (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0)
c  in CNF:
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_2
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_1
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨  b^{1, 591}_0
c  in DIMACS:
 2930  2931  2932 -590 -2933 0
 2930  2931  2932 -590 -2934 0
 2930  2931  2932 -590  2935 0

c  1+1 --> 2
c    (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0 ∧  p_590) -> (-b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0)
c  in CNF:
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_2
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨  b^{1, 591}_1
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ -p_590 ∨ -b^{1, 591}_0
c  in DIMACS:
 2930  2931 -2932 -590 -2933 0
 2930  2931 -2932 -590  2934 0
 2930  2931 -2932 -590 -2935 0

c  2+1 --> break 
c    (-b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧  p_590) -> break
c  in CNF:
c     b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 2930 -2931  2932 -590 1162 0


c  2-1 --> 1
c    (-b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧ -p_590) -> (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0)
c  in CNF:
c     b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_2
c     b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_1
c     b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨  b^{1, 591}_0
c  in DIMACS:
 2930 -2931  2932  590 -2933 0
 2930 -2931  2932  590 -2934 0
 2930 -2931  2932  590  2935 0

c  1-1 --> 0
c    (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0 ∧ -p_590) -> (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧ -b^{1, 591}_0)
c  in CNF:
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_2
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_1
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_0
c  in DIMACS:
 2930  2931 -2932  590 -2933 0
 2930  2931 -2932  590 -2934 0
 2930  2931 -2932  590 -2935 0

c  0-1 --> -1
c    (-b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧ -p_590) -> ( b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0)
c  in CNF:
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨  b^{1, 591}_2
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_1
c     b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨  b^{1, 591}_0
c  in DIMACS:
 2930  2931  2932  590  2933 0
 2930  2931  2932  590 -2934 0
 2930  2931  2932  590  2935 0

c  -1-1 --> -2
c    ( b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧  b^{1, 590}_0 ∧ -p_590) -> ( b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0)
c  in CNF:
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨  b^{1, 591}_2
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨  b^{1, 591}_1
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨  p_590 ∨ -b^{1, 591}_0
c  in DIMACS:
-2930  2931 -2932  590  2933 0
-2930  2931 -2932  590  2934 0
-2930  2931 -2932  590 -2935 0

c  -2-1 --> break 
c    ( b^{1, 590}_2 ∧  b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨  b^{1, 590}_0 ∨  p_590 ∨ break
c  in DIMACS:
-2930 -2931  2932  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 590}_2 ∧ -b^{1, 590}_1 ∧ -b^{1, 590}_0 ∧ true) 
c  in CNF:
c    -b^{1, 590}_2 ∨  b^{1, 590}_1 ∨  b^{1, 590}_0 ∨ false 
c  in DIMACS:
-2930  2931  2932  0

c  3 does not represent an automaton state.
c    -(-b^{1, 590}_2 ∧  b^{1, 590}_1 ∧  b^{1, 590}_0 ∧ true) 
c  in CNF:
c     b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ false 
c  in DIMACS:
 2930 -2931 -2932  0
c  -3 does not represent an automaton state.
c    -( b^{1, 590}_2 ∧  b^{1, 590}_1 ∧  b^{1, 590}_0 ∧ true) 
c  in CNF:
c    -b^{1, 590}_2 ∨ -b^{1, 590}_1 ∨ -b^{1, 590}_0 ∨ false 
c  in DIMACS:
-2930 -2931 -2932  0

c i = 591
c  -2+1 --> -1
c    ( b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧  p_591) -> ( b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0)
c  in CNF:
c    -b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨  b^{1, 592}_2
c    -b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_1
c    -b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨  b^{1, 592}_0
c  in DIMACS:
-2933 -2934  2935 -591  2936 0
-2933 -2934  2935 -591 -2937 0
-2933 -2934  2935 -591  2938 0

c  -1+1 --> 0
c    ( b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0 ∧  p_591) -> (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧ -b^{1, 592}_0)
c  in CNF:
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_2
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_1
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_0
c  in DIMACS:
-2933  2934 -2935 -591 -2936 0
-2933  2934 -2935 -591 -2937 0
-2933  2934 -2935 -591 -2938 0

c  0+1 --> 1
c    (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧  p_591) -> (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0)
c  in CNF:
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_2
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_1
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨  b^{1, 592}_0
c  in DIMACS:
 2933  2934  2935 -591 -2936 0
 2933  2934  2935 -591 -2937 0
 2933  2934  2935 -591  2938 0

c  1+1 --> 2
c    (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0 ∧  p_591) -> (-b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0)
c  in CNF:
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_2
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨  b^{1, 592}_1
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ -p_591 ∨ -b^{1, 592}_0
c  in DIMACS:
 2933  2934 -2935 -591 -2936 0
 2933  2934 -2935 -591  2937 0
 2933  2934 -2935 -591 -2938 0

c  2+1 --> break 
c    (-b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧  p_591) -> break
c  in CNF:
c     b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ -p_591 ∨ break
c  in DIMACS:
 2933 -2934  2935 -591 1162 0


c  2-1 --> 1
c    (-b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧ -p_591) -> (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0)
c  in CNF:
c     b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_2
c     b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_1
c     b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨  b^{1, 592}_0
c  in DIMACS:
 2933 -2934  2935  591 -2936 0
 2933 -2934  2935  591 -2937 0
 2933 -2934  2935  591  2938 0

c  1-1 --> 0
c    (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0 ∧ -p_591) -> (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧ -b^{1, 592}_0)
c  in CNF:
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_2
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_1
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_0
c  in DIMACS:
 2933  2934 -2935  591 -2936 0
 2933  2934 -2935  591 -2937 0
 2933  2934 -2935  591 -2938 0

c  0-1 --> -1
c    (-b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧ -p_591) -> ( b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0)
c  in CNF:
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨  b^{1, 592}_2
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_1
c     b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨  b^{1, 592}_0
c  in DIMACS:
 2933  2934  2935  591  2936 0
 2933  2934  2935  591 -2937 0
 2933  2934  2935  591  2938 0

c  -1-1 --> -2
c    ( b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧  b^{1, 591}_0 ∧ -p_591) -> ( b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0)
c  in CNF:
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨  b^{1, 592}_2
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨  b^{1, 592}_1
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨  p_591 ∨ -b^{1, 592}_0
c  in DIMACS:
-2933  2934 -2935  591  2936 0
-2933  2934 -2935  591  2937 0
-2933  2934 -2935  591 -2938 0

c  -2-1 --> break 
c    ( b^{1, 591}_2 ∧  b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧ -p_591) -> break
c  in CNF:
c    -b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨  b^{1, 591}_0 ∨  p_591 ∨ break
c  in DIMACS:
-2933 -2934  2935  591 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 591}_2 ∧ -b^{1, 591}_1 ∧ -b^{1, 591}_0 ∧ true) 
c  in CNF:
c    -b^{1, 591}_2 ∨  b^{1, 591}_1 ∨  b^{1, 591}_0 ∨ false 
c  in DIMACS:
-2933  2934  2935  0

c  3 does not represent an automaton state.
c    -(-b^{1, 591}_2 ∧  b^{1, 591}_1 ∧  b^{1, 591}_0 ∧ true) 
c  in CNF:
c     b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ false 
c  in DIMACS:
 2933 -2934 -2935  0
c  -3 does not represent an automaton state.
c    -( b^{1, 591}_2 ∧  b^{1, 591}_1 ∧  b^{1, 591}_0 ∧ true) 
c  in CNF:
c    -b^{1, 591}_2 ∨ -b^{1, 591}_1 ∨ -b^{1, 591}_0 ∨ false 
c  in DIMACS:
-2933 -2934 -2935  0

c i = 592
c  -2+1 --> -1
c    ( b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧  p_592) -> ( b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0)
c  in CNF:
c    -b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨  b^{1, 593}_2
c    -b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_1
c    -b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨  b^{1, 593}_0
c  in DIMACS:
-2936 -2937  2938 -592  2939 0
-2936 -2937  2938 -592 -2940 0
-2936 -2937  2938 -592  2941 0

c  -1+1 --> 0
c    ( b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0 ∧  p_592) -> (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧ -b^{1, 593}_0)
c  in CNF:
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_2
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_1
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_0
c  in DIMACS:
-2936  2937 -2938 -592 -2939 0
-2936  2937 -2938 -592 -2940 0
-2936  2937 -2938 -592 -2941 0

c  0+1 --> 1
c    (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧  p_592) -> (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0)
c  in CNF:
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_2
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_1
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨  b^{1, 593}_0
c  in DIMACS:
 2936  2937  2938 -592 -2939 0
 2936  2937  2938 -592 -2940 0
 2936  2937  2938 -592  2941 0

c  1+1 --> 2
c    (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0 ∧  p_592) -> (-b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0)
c  in CNF:
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_2
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨  b^{1, 593}_1
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ -p_592 ∨ -b^{1, 593}_0
c  in DIMACS:
 2936  2937 -2938 -592 -2939 0
 2936  2937 -2938 -592  2940 0
 2936  2937 -2938 -592 -2941 0

c  2+1 --> break 
c    (-b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧  p_592) -> break
c  in CNF:
c     b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 2936 -2937  2938 -592 1162 0


c  2-1 --> 1
c    (-b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧ -p_592) -> (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0)
c  in CNF:
c     b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_2
c     b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_1
c     b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨  b^{1, 593}_0
c  in DIMACS:
 2936 -2937  2938  592 -2939 0
 2936 -2937  2938  592 -2940 0
 2936 -2937  2938  592  2941 0

c  1-1 --> 0
c    (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0 ∧ -p_592) -> (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧ -b^{1, 593}_0)
c  in CNF:
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_2
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_1
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_0
c  in DIMACS:
 2936  2937 -2938  592 -2939 0
 2936  2937 -2938  592 -2940 0
 2936  2937 -2938  592 -2941 0

c  0-1 --> -1
c    (-b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧ -p_592) -> ( b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0)
c  in CNF:
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨  b^{1, 593}_2
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_1
c     b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨  b^{1, 593}_0
c  in DIMACS:
 2936  2937  2938  592  2939 0
 2936  2937  2938  592 -2940 0
 2936  2937  2938  592  2941 0

c  -1-1 --> -2
c    ( b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧  b^{1, 592}_0 ∧ -p_592) -> ( b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0)
c  in CNF:
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨  b^{1, 593}_2
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨  b^{1, 593}_1
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨  p_592 ∨ -b^{1, 593}_0
c  in DIMACS:
-2936  2937 -2938  592  2939 0
-2936  2937 -2938  592  2940 0
-2936  2937 -2938  592 -2941 0

c  -2-1 --> break 
c    ( b^{1, 592}_2 ∧  b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨  b^{1, 592}_0 ∨  p_592 ∨ break
c  in DIMACS:
-2936 -2937  2938  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 592}_2 ∧ -b^{1, 592}_1 ∧ -b^{1, 592}_0 ∧ true) 
c  in CNF:
c    -b^{1, 592}_2 ∨  b^{1, 592}_1 ∨  b^{1, 592}_0 ∨ false 
c  in DIMACS:
-2936  2937  2938  0

c  3 does not represent an automaton state.
c    -(-b^{1, 592}_2 ∧  b^{1, 592}_1 ∧  b^{1, 592}_0 ∧ true) 
c  in CNF:
c     b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ false 
c  in DIMACS:
 2936 -2937 -2938  0
c  -3 does not represent an automaton state.
c    -( b^{1, 592}_2 ∧  b^{1, 592}_1 ∧  b^{1, 592}_0 ∧ true) 
c  in CNF:
c    -b^{1, 592}_2 ∨ -b^{1, 592}_1 ∨ -b^{1, 592}_0 ∨ false 
c  in DIMACS:
-2936 -2937 -2938  0

c i = 593
c  -2+1 --> -1
c    ( b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧  p_593) -> ( b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0)
c  in CNF:
c    -b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨  b^{1, 594}_2
c    -b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_1
c    -b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨  b^{1, 594}_0
c  in DIMACS:
-2939 -2940  2941 -593  2942 0
-2939 -2940  2941 -593 -2943 0
-2939 -2940  2941 -593  2944 0

c  -1+1 --> 0
c    ( b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0 ∧  p_593) -> (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧ -b^{1, 594}_0)
c  in CNF:
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_2
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_1
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_0
c  in DIMACS:
-2939  2940 -2941 -593 -2942 0
-2939  2940 -2941 -593 -2943 0
-2939  2940 -2941 -593 -2944 0

c  0+1 --> 1
c    (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧  p_593) -> (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0)
c  in CNF:
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_2
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_1
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨  b^{1, 594}_0
c  in DIMACS:
 2939  2940  2941 -593 -2942 0
 2939  2940  2941 -593 -2943 0
 2939  2940  2941 -593  2944 0

c  1+1 --> 2
c    (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0 ∧  p_593) -> (-b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0)
c  in CNF:
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_2
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨  b^{1, 594}_1
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ -p_593 ∨ -b^{1, 594}_0
c  in DIMACS:
 2939  2940 -2941 -593 -2942 0
 2939  2940 -2941 -593  2943 0
 2939  2940 -2941 -593 -2944 0

c  2+1 --> break 
c    (-b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧  p_593) -> break
c  in CNF:
c     b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ -p_593 ∨ break
c  in DIMACS:
 2939 -2940  2941 -593 1162 0


c  2-1 --> 1
c    (-b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧ -p_593) -> (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0)
c  in CNF:
c     b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_2
c     b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_1
c     b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨  b^{1, 594}_0
c  in DIMACS:
 2939 -2940  2941  593 -2942 0
 2939 -2940  2941  593 -2943 0
 2939 -2940  2941  593  2944 0

c  1-1 --> 0
c    (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0 ∧ -p_593) -> (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧ -b^{1, 594}_0)
c  in CNF:
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_2
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_1
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_0
c  in DIMACS:
 2939  2940 -2941  593 -2942 0
 2939  2940 -2941  593 -2943 0
 2939  2940 -2941  593 -2944 0

c  0-1 --> -1
c    (-b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧ -p_593) -> ( b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0)
c  in CNF:
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨  b^{1, 594}_2
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_1
c     b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨  b^{1, 594}_0
c  in DIMACS:
 2939  2940  2941  593  2942 0
 2939  2940  2941  593 -2943 0
 2939  2940  2941  593  2944 0

c  -1-1 --> -2
c    ( b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧  b^{1, 593}_0 ∧ -p_593) -> ( b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0)
c  in CNF:
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨  b^{1, 594}_2
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨  b^{1, 594}_1
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨  p_593 ∨ -b^{1, 594}_0
c  in DIMACS:
-2939  2940 -2941  593  2942 0
-2939  2940 -2941  593  2943 0
-2939  2940 -2941  593 -2944 0

c  -2-1 --> break 
c    ( b^{1, 593}_2 ∧  b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧ -p_593) -> break
c  in CNF:
c    -b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨  b^{1, 593}_0 ∨  p_593 ∨ break
c  in DIMACS:
-2939 -2940  2941  593 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 593}_2 ∧ -b^{1, 593}_1 ∧ -b^{1, 593}_0 ∧ true) 
c  in CNF:
c    -b^{1, 593}_2 ∨  b^{1, 593}_1 ∨  b^{1, 593}_0 ∨ false 
c  in DIMACS:
-2939  2940  2941  0

c  3 does not represent an automaton state.
c    -(-b^{1, 593}_2 ∧  b^{1, 593}_1 ∧  b^{1, 593}_0 ∧ true) 
c  in CNF:
c     b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ false 
c  in DIMACS:
 2939 -2940 -2941  0
c  -3 does not represent an automaton state.
c    -( b^{1, 593}_2 ∧  b^{1, 593}_1 ∧  b^{1, 593}_0 ∧ true) 
c  in CNF:
c    -b^{1, 593}_2 ∨ -b^{1, 593}_1 ∨ -b^{1, 593}_0 ∨ false 
c  in DIMACS:
-2939 -2940 -2941  0

c i = 594
c  -2+1 --> -1
c    ( b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧  p_594) -> ( b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0)
c  in CNF:
c    -b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨  b^{1, 595}_2
c    -b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_1
c    -b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨  b^{1, 595}_0
c  in DIMACS:
-2942 -2943  2944 -594  2945 0
-2942 -2943  2944 -594 -2946 0
-2942 -2943  2944 -594  2947 0

c  -1+1 --> 0
c    ( b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0 ∧  p_594) -> (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧ -b^{1, 595}_0)
c  in CNF:
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_2
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_1
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_0
c  in DIMACS:
-2942  2943 -2944 -594 -2945 0
-2942  2943 -2944 -594 -2946 0
-2942  2943 -2944 -594 -2947 0

c  0+1 --> 1
c    (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧  p_594) -> (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0)
c  in CNF:
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_2
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_1
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨  b^{1, 595}_0
c  in DIMACS:
 2942  2943  2944 -594 -2945 0
 2942  2943  2944 -594 -2946 0
 2942  2943  2944 -594  2947 0

c  1+1 --> 2
c    (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0 ∧  p_594) -> (-b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0)
c  in CNF:
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_2
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨  b^{1, 595}_1
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ -p_594 ∨ -b^{1, 595}_0
c  in DIMACS:
 2942  2943 -2944 -594 -2945 0
 2942  2943 -2944 -594  2946 0
 2942  2943 -2944 -594 -2947 0

c  2+1 --> break 
c    (-b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧  p_594) -> break
c  in CNF:
c     b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 2942 -2943  2944 -594 1162 0


c  2-1 --> 1
c    (-b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧ -p_594) -> (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0)
c  in CNF:
c     b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_2
c     b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_1
c     b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨  b^{1, 595}_0
c  in DIMACS:
 2942 -2943  2944  594 -2945 0
 2942 -2943  2944  594 -2946 0
 2942 -2943  2944  594  2947 0

c  1-1 --> 0
c    (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0 ∧ -p_594) -> (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧ -b^{1, 595}_0)
c  in CNF:
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_2
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_1
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_0
c  in DIMACS:
 2942  2943 -2944  594 -2945 0
 2942  2943 -2944  594 -2946 0
 2942  2943 -2944  594 -2947 0

c  0-1 --> -1
c    (-b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧ -p_594) -> ( b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0)
c  in CNF:
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨  b^{1, 595}_2
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_1
c     b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨  b^{1, 595}_0
c  in DIMACS:
 2942  2943  2944  594  2945 0
 2942  2943  2944  594 -2946 0
 2942  2943  2944  594  2947 0

c  -1-1 --> -2
c    ( b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧  b^{1, 594}_0 ∧ -p_594) -> ( b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0)
c  in CNF:
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨  b^{1, 595}_2
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨  b^{1, 595}_1
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨  p_594 ∨ -b^{1, 595}_0
c  in DIMACS:
-2942  2943 -2944  594  2945 0
-2942  2943 -2944  594  2946 0
-2942  2943 -2944  594 -2947 0

c  -2-1 --> break 
c    ( b^{1, 594}_2 ∧  b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨  b^{1, 594}_0 ∨  p_594 ∨ break
c  in DIMACS:
-2942 -2943  2944  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 594}_2 ∧ -b^{1, 594}_1 ∧ -b^{1, 594}_0 ∧ true) 
c  in CNF:
c    -b^{1, 594}_2 ∨  b^{1, 594}_1 ∨  b^{1, 594}_0 ∨ false 
c  in DIMACS:
-2942  2943  2944  0

c  3 does not represent an automaton state.
c    -(-b^{1, 594}_2 ∧  b^{1, 594}_1 ∧  b^{1, 594}_0 ∧ true) 
c  in CNF:
c     b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ false 
c  in DIMACS:
 2942 -2943 -2944  0
c  -3 does not represent an automaton state.
c    -( b^{1, 594}_2 ∧  b^{1, 594}_1 ∧  b^{1, 594}_0 ∧ true) 
c  in CNF:
c    -b^{1, 594}_2 ∨ -b^{1, 594}_1 ∨ -b^{1, 594}_0 ∨ false 
c  in DIMACS:
-2942 -2943 -2944  0

c i = 595
c  -2+1 --> -1
c    ( b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧  p_595) -> ( b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0)
c  in CNF:
c    -b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨  b^{1, 596}_2
c    -b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_1
c    -b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨  b^{1, 596}_0
c  in DIMACS:
-2945 -2946  2947 -595  2948 0
-2945 -2946  2947 -595 -2949 0
-2945 -2946  2947 -595  2950 0

c  -1+1 --> 0
c    ( b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0 ∧  p_595) -> (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧ -b^{1, 596}_0)
c  in CNF:
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_2
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_1
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_0
c  in DIMACS:
-2945  2946 -2947 -595 -2948 0
-2945  2946 -2947 -595 -2949 0
-2945  2946 -2947 -595 -2950 0

c  0+1 --> 1
c    (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧  p_595) -> (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0)
c  in CNF:
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_2
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_1
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨  b^{1, 596}_0
c  in DIMACS:
 2945  2946  2947 -595 -2948 0
 2945  2946  2947 -595 -2949 0
 2945  2946  2947 -595  2950 0

c  1+1 --> 2
c    (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0 ∧  p_595) -> (-b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0)
c  in CNF:
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_2
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨  b^{1, 596}_1
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ -p_595 ∨ -b^{1, 596}_0
c  in DIMACS:
 2945  2946 -2947 -595 -2948 0
 2945  2946 -2947 -595  2949 0
 2945  2946 -2947 -595 -2950 0

c  2+1 --> break 
c    (-b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧  p_595) -> break
c  in CNF:
c     b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 2945 -2946  2947 -595 1162 0


c  2-1 --> 1
c    (-b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧ -p_595) -> (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0)
c  in CNF:
c     b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_2
c     b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_1
c     b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨  b^{1, 596}_0
c  in DIMACS:
 2945 -2946  2947  595 -2948 0
 2945 -2946  2947  595 -2949 0
 2945 -2946  2947  595  2950 0

c  1-1 --> 0
c    (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0 ∧ -p_595) -> (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧ -b^{1, 596}_0)
c  in CNF:
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_2
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_1
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_0
c  in DIMACS:
 2945  2946 -2947  595 -2948 0
 2945  2946 -2947  595 -2949 0
 2945  2946 -2947  595 -2950 0

c  0-1 --> -1
c    (-b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧ -p_595) -> ( b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0)
c  in CNF:
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨  b^{1, 596}_2
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_1
c     b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨  b^{1, 596}_0
c  in DIMACS:
 2945  2946  2947  595  2948 0
 2945  2946  2947  595 -2949 0
 2945  2946  2947  595  2950 0

c  -1-1 --> -2
c    ( b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧  b^{1, 595}_0 ∧ -p_595) -> ( b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0)
c  in CNF:
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨  b^{1, 596}_2
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨  b^{1, 596}_1
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨  p_595 ∨ -b^{1, 596}_0
c  in DIMACS:
-2945  2946 -2947  595  2948 0
-2945  2946 -2947  595  2949 0
-2945  2946 -2947  595 -2950 0

c  -2-1 --> break 
c    ( b^{1, 595}_2 ∧  b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨  b^{1, 595}_0 ∨  p_595 ∨ break
c  in DIMACS:
-2945 -2946  2947  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 595}_2 ∧ -b^{1, 595}_1 ∧ -b^{1, 595}_0 ∧ true) 
c  in CNF:
c    -b^{1, 595}_2 ∨  b^{1, 595}_1 ∨  b^{1, 595}_0 ∨ false 
c  in DIMACS:
-2945  2946  2947  0

c  3 does not represent an automaton state.
c    -(-b^{1, 595}_2 ∧  b^{1, 595}_1 ∧  b^{1, 595}_0 ∧ true) 
c  in CNF:
c     b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ false 
c  in DIMACS:
 2945 -2946 -2947  0
c  -3 does not represent an automaton state.
c    -( b^{1, 595}_2 ∧  b^{1, 595}_1 ∧  b^{1, 595}_0 ∧ true) 
c  in CNF:
c    -b^{1, 595}_2 ∨ -b^{1, 595}_1 ∨ -b^{1, 595}_0 ∨ false 
c  in DIMACS:
-2945 -2946 -2947  0

c i = 596
c  -2+1 --> -1
c    ( b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧  p_596) -> ( b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0)
c  in CNF:
c    -b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨  b^{1, 597}_2
c    -b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_1
c    -b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨  b^{1, 597}_0
c  in DIMACS:
-2948 -2949  2950 -596  2951 0
-2948 -2949  2950 -596 -2952 0
-2948 -2949  2950 -596  2953 0

c  -1+1 --> 0
c    ( b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0 ∧  p_596) -> (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧ -b^{1, 597}_0)
c  in CNF:
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_2
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_1
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_0
c  in DIMACS:
-2948  2949 -2950 -596 -2951 0
-2948  2949 -2950 -596 -2952 0
-2948  2949 -2950 -596 -2953 0

c  0+1 --> 1
c    (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧  p_596) -> (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0)
c  in CNF:
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_2
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_1
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨  b^{1, 597}_0
c  in DIMACS:
 2948  2949  2950 -596 -2951 0
 2948  2949  2950 -596 -2952 0
 2948  2949  2950 -596  2953 0

c  1+1 --> 2
c    (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0 ∧  p_596) -> (-b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0)
c  in CNF:
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_2
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨  b^{1, 597}_1
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ -p_596 ∨ -b^{1, 597}_0
c  in DIMACS:
 2948  2949 -2950 -596 -2951 0
 2948  2949 -2950 -596  2952 0
 2948  2949 -2950 -596 -2953 0

c  2+1 --> break 
c    (-b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧  p_596) -> break
c  in CNF:
c     b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ -p_596 ∨ break
c  in DIMACS:
 2948 -2949  2950 -596 1162 0


c  2-1 --> 1
c    (-b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧ -p_596) -> (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0)
c  in CNF:
c     b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_2
c     b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_1
c     b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨  b^{1, 597}_0
c  in DIMACS:
 2948 -2949  2950  596 -2951 0
 2948 -2949  2950  596 -2952 0
 2948 -2949  2950  596  2953 0

c  1-1 --> 0
c    (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0 ∧ -p_596) -> (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧ -b^{1, 597}_0)
c  in CNF:
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_2
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_1
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_0
c  in DIMACS:
 2948  2949 -2950  596 -2951 0
 2948  2949 -2950  596 -2952 0
 2948  2949 -2950  596 -2953 0

c  0-1 --> -1
c    (-b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧ -p_596) -> ( b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0)
c  in CNF:
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨  b^{1, 597}_2
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_1
c     b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨  b^{1, 597}_0
c  in DIMACS:
 2948  2949  2950  596  2951 0
 2948  2949  2950  596 -2952 0
 2948  2949  2950  596  2953 0

c  -1-1 --> -2
c    ( b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧  b^{1, 596}_0 ∧ -p_596) -> ( b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0)
c  in CNF:
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨  b^{1, 597}_2
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨  b^{1, 597}_1
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨  p_596 ∨ -b^{1, 597}_0
c  in DIMACS:
-2948  2949 -2950  596  2951 0
-2948  2949 -2950  596  2952 0
-2948  2949 -2950  596 -2953 0

c  -2-1 --> break 
c    ( b^{1, 596}_2 ∧  b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧ -p_596) -> break
c  in CNF:
c    -b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨  b^{1, 596}_0 ∨  p_596 ∨ break
c  in DIMACS:
-2948 -2949  2950  596 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 596}_2 ∧ -b^{1, 596}_1 ∧ -b^{1, 596}_0 ∧ true) 
c  in CNF:
c    -b^{1, 596}_2 ∨  b^{1, 596}_1 ∨  b^{1, 596}_0 ∨ false 
c  in DIMACS:
-2948  2949  2950  0

c  3 does not represent an automaton state.
c    -(-b^{1, 596}_2 ∧  b^{1, 596}_1 ∧  b^{1, 596}_0 ∧ true) 
c  in CNF:
c     b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ false 
c  in DIMACS:
 2948 -2949 -2950  0
c  -3 does not represent an automaton state.
c    -( b^{1, 596}_2 ∧  b^{1, 596}_1 ∧  b^{1, 596}_0 ∧ true) 
c  in CNF:
c    -b^{1, 596}_2 ∨ -b^{1, 596}_1 ∨ -b^{1, 596}_0 ∨ false 
c  in DIMACS:
-2948 -2949 -2950  0

c i = 597
c  -2+1 --> -1
c    ( b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧  p_597) -> ( b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0)
c  in CNF:
c    -b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨  b^{1, 598}_2
c    -b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_1
c    -b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨  b^{1, 598}_0
c  in DIMACS:
-2951 -2952  2953 -597  2954 0
-2951 -2952  2953 -597 -2955 0
-2951 -2952  2953 -597  2956 0

c  -1+1 --> 0
c    ( b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0 ∧  p_597) -> (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧ -b^{1, 598}_0)
c  in CNF:
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_2
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_1
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_0
c  in DIMACS:
-2951  2952 -2953 -597 -2954 0
-2951  2952 -2953 -597 -2955 0
-2951  2952 -2953 -597 -2956 0

c  0+1 --> 1
c    (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧  p_597) -> (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0)
c  in CNF:
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_2
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_1
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨  b^{1, 598}_0
c  in DIMACS:
 2951  2952  2953 -597 -2954 0
 2951  2952  2953 -597 -2955 0
 2951  2952  2953 -597  2956 0

c  1+1 --> 2
c    (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0 ∧  p_597) -> (-b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0)
c  in CNF:
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_2
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨  b^{1, 598}_1
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ -p_597 ∨ -b^{1, 598}_0
c  in DIMACS:
 2951  2952 -2953 -597 -2954 0
 2951  2952 -2953 -597  2955 0
 2951  2952 -2953 -597 -2956 0

c  2+1 --> break 
c    (-b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧  p_597) -> break
c  in CNF:
c     b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ -p_597 ∨ break
c  in DIMACS:
 2951 -2952  2953 -597 1162 0


c  2-1 --> 1
c    (-b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧ -p_597) -> (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0)
c  in CNF:
c     b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_2
c     b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_1
c     b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨  b^{1, 598}_0
c  in DIMACS:
 2951 -2952  2953  597 -2954 0
 2951 -2952  2953  597 -2955 0
 2951 -2952  2953  597  2956 0

c  1-1 --> 0
c    (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0 ∧ -p_597) -> (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧ -b^{1, 598}_0)
c  in CNF:
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_2
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_1
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_0
c  in DIMACS:
 2951  2952 -2953  597 -2954 0
 2951  2952 -2953  597 -2955 0
 2951  2952 -2953  597 -2956 0

c  0-1 --> -1
c    (-b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧ -p_597) -> ( b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0)
c  in CNF:
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨  b^{1, 598}_2
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_1
c     b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨  b^{1, 598}_0
c  in DIMACS:
 2951  2952  2953  597  2954 0
 2951  2952  2953  597 -2955 0
 2951  2952  2953  597  2956 0

c  -1-1 --> -2
c    ( b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧  b^{1, 597}_0 ∧ -p_597) -> ( b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0)
c  in CNF:
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨  b^{1, 598}_2
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨  b^{1, 598}_1
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨  p_597 ∨ -b^{1, 598}_0
c  in DIMACS:
-2951  2952 -2953  597  2954 0
-2951  2952 -2953  597  2955 0
-2951  2952 -2953  597 -2956 0

c  -2-1 --> break 
c    ( b^{1, 597}_2 ∧  b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧ -p_597) -> break
c  in CNF:
c    -b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨  b^{1, 597}_0 ∨  p_597 ∨ break
c  in DIMACS:
-2951 -2952  2953  597 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 597}_2 ∧ -b^{1, 597}_1 ∧ -b^{1, 597}_0 ∧ true) 
c  in CNF:
c    -b^{1, 597}_2 ∨  b^{1, 597}_1 ∨  b^{1, 597}_0 ∨ false 
c  in DIMACS:
-2951  2952  2953  0

c  3 does not represent an automaton state.
c    -(-b^{1, 597}_2 ∧  b^{1, 597}_1 ∧  b^{1, 597}_0 ∧ true) 
c  in CNF:
c     b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ false 
c  in DIMACS:
 2951 -2952 -2953  0
c  -3 does not represent an automaton state.
c    -( b^{1, 597}_2 ∧  b^{1, 597}_1 ∧  b^{1, 597}_0 ∧ true) 
c  in CNF:
c    -b^{1, 597}_2 ∨ -b^{1, 597}_1 ∨ -b^{1, 597}_0 ∨ false 
c  in DIMACS:
-2951 -2952 -2953  0

c i = 598
c  -2+1 --> -1
c    ( b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧  p_598) -> ( b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0)
c  in CNF:
c    -b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨  b^{1, 599}_2
c    -b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_1
c    -b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨  b^{1, 599}_0
c  in DIMACS:
-2954 -2955  2956 -598  2957 0
-2954 -2955  2956 -598 -2958 0
-2954 -2955  2956 -598  2959 0

c  -1+1 --> 0
c    ( b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0 ∧  p_598) -> (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧ -b^{1, 599}_0)
c  in CNF:
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_2
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_1
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_0
c  in DIMACS:
-2954  2955 -2956 -598 -2957 0
-2954  2955 -2956 -598 -2958 0
-2954  2955 -2956 -598 -2959 0

c  0+1 --> 1
c    (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧  p_598) -> (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0)
c  in CNF:
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_2
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_1
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨  b^{1, 599}_0
c  in DIMACS:
 2954  2955  2956 -598 -2957 0
 2954  2955  2956 -598 -2958 0
 2954  2955  2956 -598  2959 0

c  1+1 --> 2
c    (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0 ∧  p_598) -> (-b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0)
c  in CNF:
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_2
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨  b^{1, 599}_1
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ -p_598 ∨ -b^{1, 599}_0
c  in DIMACS:
 2954  2955 -2956 -598 -2957 0
 2954  2955 -2956 -598  2958 0
 2954  2955 -2956 -598 -2959 0

c  2+1 --> break 
c    (-b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧  p_598) -> break
c  in CNF:
c     b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 2954 -2955  2956 -598 1162 0


c  2-1 --> 1
c    (-b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧ -p_598) -> (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0)
c  in CNF:
c     b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_2
c     b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_1
c     b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨  b^{1, 599}_0
c  in DIMACS:
 2954 -2955  2956  598 -2957 0
 2954 -2955  2956  598 -2958 0
 2954 -2955  2956  598  2959 0

c  1-1 --> 0
c    (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0 ∧ -p_598) -> (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧ -b^{1, 599}_0)
c  in CNF:
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_2
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_1
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_0
c  in DIMACS:
 2954  2955 -2956  598 -2957 0
 2954  2955 -2956  598 -2958 0
 2954  2955 -2956  598 -2959 0

c  0-1 --> -1
c    (-b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧ -p_598) -> ( b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0)
c  in CNF:
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨  b^{1, 599}_2
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_1
c     b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨  b^{1, 599}_0
c  in DIMACS:
 2954  2955  2956  598  2957 0
 2954  2955  2956  598 -2958 0
 2954  2955  2956  598  2959 0

c  -1-1 --> -2
c    ( b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧  b^{1, 598}_0 ∧ -p_598) -> ( b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0)
c  in CNF:
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨  b^{1, 599}_2
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨  b^{1, 599}_1
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨  p_598 ∨ -b^{1, 599}_0
c  in DIMACS:
-2954  2955 -2956  598  2957 0
-2954  2955 -2956  598  2958 0
-2954  2955 -2956  598 -2959 0

c  -2-1 --> break 
c    ( b^{1, 598}_2 ∧  b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨  b^{1, 598}_0 ∨  p_598 ∨ break
c  in DIMACS:
-2954 -2955  2956  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 598}_2 ∧ -b^{1, 598}_1 ∧ -b^{1, 598}_0 ∧ true) 
c  in CNF:
c    -b^{1, 598}_2 ∨  b^{1, 598}_1 ∨  b^{1, 598}_0 ∨ false 
c  in DIMACS:
-2954  2955  2956  0

c  3 does not represent an automaton state.
c    -(-b^{1, 598}_2 ∧  b^{1, 598}_1 ∧  b^{1, 598}_0 ∧ true) 
c  in CNF:
c     b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ false 
c  in DIMACS:
 2954 -2955 -2956  0
c  -3 does not represent an automaton state.
c    -( b^{1, 598}_2 ∧  b^{1, 598}_1 ∧  b^{1, 598}_0 ∧ true) 
c  in CNF:
c    -b^{1, 598}_2 ∨ -b^{1, 598}_1 ∨ -b^{1, 598}_0 ∨ false 
c  in DIMACS:
-2954 -2955 -2956  0

c i = 599
c  -2+1 --> -1
c    ( b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧  p_599) -> ( b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0)
c  in CNF:
c    -b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨  b^{1, 600}_2
c    -b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_1
c    -b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨  b^{1, 600}_0
c  in DIMACS:
-2957 -2958  2959 -599  2960 0
-2957 -2958  2959 -599 -2961 0
-2957 -2958  2959 -599  2962 0

c  -1+1 --> 0
c    ( b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0 ∧  p_599) -> (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧ -b^{1, 600}_0)
c  in CNF:
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_2
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_1
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_0
c  in DIMACS:
-2957  2958 -2959 -599 -2960 0
-2957  2958 -2959 -599 -2961 0
-2957  2958 -2959 -599 -2962 0

c  0+1 --> 1
c    (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧  p_599) -> (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0)
c  in CNF:
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_2
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_1
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨  b^{1, 600}_0
c  in DIMACS:
 2957  2958  2959 -599 -2960 0
 2957  2958  2959 -599 -2961 0
 2957  2958  2959 -599  2962 0

c  1+1 --> 2
c    (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0 ∧  p_599) -> (-b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0)
c  in CNF:
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_2
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨  b^{1, 600}_1
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ -p_599 ∨ -b^{1, 600}_0
c  in DIMACS:
 2957  2958 -2959 -599 -2960 0
 2957  2958 -2959 -599  2961 0
 2957  2958 -2959 -599 -2962 0

c  2+1 --> break 
c    (-b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧  p_599) -> break
c  in CNF:
c     b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ -p_599 ∨ break
c  in DIMACS:
 2957 -2958  2959 -599 1162 0


c  2-1 --> 1
c    (-b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧ -p_599) -> (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0)
c  in CNF:
c     b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_2
c     b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_1
c     b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨  b^{1, 600}_0
c  in DIMACS:
 2957 -2958  2959  599 -2960 0
 2957 -2958  2959  599 -2961 0
 2957 -2958  2959  599  2962 0

c  1-1 --> 0
c    (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0 ∧ -p_599) -> (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧ -b^{1, 600}_0)
c  in CNF:
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_2
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_1
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_0
c  in DIMACS:
 2957  2958 -2959  599 -2960 0
 2957  2958 -2959  599 -2961 0
 2957  2958 -2959  599 -2962 0

c  0-1 --> -1
c    (-b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧ -p_599) -> ( b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0)
c  in CNF:
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨  b^{1, 600}_2
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_1
c     b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨  b^{1, 600}_0
c  in DIMACS:
 2957  2958  2959  599  2960 0
 2957  2958  2959  599 -2961 0
 2957  2958  2959  599  2962 0

c  -1-1 --> -2
c    ( b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧  b^{1, 599}_0 ∧ -p_599) -> ( b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0)
c  in CNF:
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨  b^{1, 600}_2
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨  b^{1, 600}_1
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨  p_599 ∨ -b^{1, 600}_0
c  in DIMACS:
-2957  2958 -2959  599  2960 0
-2957  2958 -2959  599  2961 0
-2957  2958 -2959  599 -2962 0

c  -2-1 --> break 
c    ( b^{1, 599}_2 ∧  b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧ -p_599) -> break
c  in CNF:
c    -b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨  b^{1, 599}_0 ∨  p_599 ∨ break
c  in DIMACS:
-2957 -2958  2959  599 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 599}_2 ∧ -b^{1, 599}_1 ∧ -b^{1, 599}_0 ∧ true) 
c  in CNF:
c    -b^{1, 599}_2 ∨  b^{1, 599}_1 ∨  b^{1, 599}_0 ∨ false 
c  in DIMACS:
-2957  2958  2959  0

c  3 does not represent an automaton state.
c    -(-b^{1, 599}_2 ∧  b^{1, 599}_1 ∧  b^{1, 599}_0 ∧ true) 
c  in CNF:
c     b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ false 
c  in DIMACS:
 2957 -2958 -2959  0
c  -3 does not represent an automaton state.
c    -( b^{1, 599}_2 ∧  b^{1, 599}_1 ∧  b^{1, 599}_0 ∧ true) 
c  in CNF:
c    -b^{1, 599}_2 ∨ -b^{1, 599}_1 ∨ -b^{1, 599}_0 ∨ false 
c  in DIMACS:
-2957 -2958 -2959  0

c i = 600
c  -2+1 --> -1
c    ( b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧  p_600) -> ( b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0)
c  in CNF:
c    -b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨  b^{1, 601}_2
c    -b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_1
c    -b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨  b^{1, 601}_0
c  in DIMACS:
-2960 -2961  2962 -600  2963 0
-2960 -2961  2962 -600 -2964 0
-2960 -2961  2962 -600  2965 0

c  -1+1 --> 0
c    ( b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0 ∧  p_600) -> (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧ -b^{1, 601}_0)
c  in CNF:
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_2
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_1
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_0
c  in DIMACS:
-2960  2961 -2962 -600 -2963 0
-2960  2961 -2962 -600 -2964 0
-2960  2961 -2962 -600 -2965 0

c  0+1 --> 1
c    (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧  p_600) -> (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0)
c  in CNF:
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_2
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_1
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨  b^{1, 601}_0
c  in DIMACS:
 2960  2961  2962 -600 -2963 0
 2960  2961  2962 -600 -2964 0
 2960  2961  2962 -600  2965 0

c  1+1 --> 2
c    (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0 ∧  p_600) -> (-b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0)
c  in CNF:
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_2
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨  b^{1, 601}_1
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ -p_600 ∨ -b^{1, 601}_0
c  in DIMACS:
 2960  2961 -2962 -600 -2963 0
 2960  2961 -2962 -600  2964 0
 2960  2961 -2962 -600 -2965 0

c  2+1 --> break 
c    (-b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧  p_600) -> break
c  in CNF:
c     b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 2960 -2961  2962 -600 1162 0


c  2-1 --> 1
c    (-b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧ -p_600) -> (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0)
c  in CNF:
c     b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_2
c     b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_1
c     b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨  b^{1, 601}_0
c  in DIMACS:
 2960 -2961  2962  600 -2963 0
 2960 -2961  2962  600 -2964 0
 2960 -2961  2962  600  2965 0

c  1-1 --> 0
c    (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0 ∧ -p_600) -> (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧ -b^{1, 601}_0)
c  in CNF:
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_2
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_1
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_0
c  in DIMACS:
 2960  2961 -2962  600 -2963 0
 2960  2961 -2962  600 -2964 0
 2960  2961 -2962  600 -2965 0

c  0-1 --> -1
c    (-b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧ -p_600) -> ( b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0)
c  in CNF:
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨  b^{1, 601}_2
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_1
c     b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨  b^{1, 601}_0
c  in DIMACS:
 2960  2961  2962  600  2963 0
 2960  2961  2962  600 -2964 0
 2960  2961  2962  600  2965 0

c  -1-1 --> -2
c    ( b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧  b^{1, 600}_0 ∧ -p_600) -> ( b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0)
c  in CNF:
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨  b^{1, 601}_2
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨  b^{1, 601}_1
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨  p_600 ∨ -b^{1, 601}_0
c  in DIMACS:
-2960  2961 -2962  600  2963 0
-2960  2961 -2962  600  2964 0
-2960  2961 -2962  600 -2965 0

c  -2-1 --> break 
c    ( b^{1, 600}_2 ∧  b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨  b^{1, 600}_0 ∨  p_600 ∨ break
c  in DIMACS:
-2960 -2961  2962  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 600}_2 ∧ -b^{1, 600}_1 ∧ -b^{1, 600}_0 ∧ true) 
c  in CNF:
c    -b^{1, 600}_2 ∨  b^{1, 600}_1 ∨  b^{1, 600}_0 ∨ false 
c  in DIMACS:
-2960  2961  2962  0

c  3 does not represent an automaton state.
c    -(-b^{1, 600}_2 ∧  b^{1, 600}_1 ∧  b^{1, 600}_0 ∧ true) 
c  in CNF:
c     b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ false 
c  in DIMACS:
 2960 -2961 -2962  0
c  -3 does not represent an automaton state.
c    -( b^{1, 600}_2 ∧  b^{1, 600}_1 ∧  b^{1, 600}_0 ∧ true) 
c  in CNF:
c    -b^{1, 600}_2 ∨ -b^{1, 600}_1 ∨ -b^{1, 600}_0 ∨ false 
c  in DIMACS:
-2960 -2961 -2962  0

c i = 601
c  -2+1 --> -1
c    ( b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧  p_601) -> ( b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0)
c  in CNF:
c    -b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨  b^{1, 602}_2
c    -b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_1
c    -b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨  b^{1, 602}_0
c  in DIMACS:
-2963 -2964  2965 -601  2966 0
-2963 -2964  2965 -601 -2967 0
-2963 -2964  2965 -601  2968 0

c  -1+1 --> 0
c    ( b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0 ∧  p_601) -> (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧ -b^{1, 602}_0)
c  in CNF:
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_2
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_1
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_0
c  in DIMACS:
-2963  2964 -2965 -601 -2966 0
-2963  2964 -2965 -601 -2967 0
-2963  2964 -2965 -601 -2968 0

c  0+1 --> 1
c    (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧  p_601) -> (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0)
c  in CNF:
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_2
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_1
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨  b^{1, 602}_0
c  in DIMACS:
 2963  2964  2965 -601 -2966 0
 2963  2964  2965 -601 -2967 0
 2963  2964  2965 -601  2968 0

c  1+1 --> 2
c    (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0 ∧  p_601) -> (-b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0)
c  in CNF:
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_2
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨  b^{1, 602}_1
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ -p_601 ∨ -b^{1, 602}_0
c  in DIMACS:
 2963  2964 -2965 -601 -2966 0
 2963  2964 -2965 -601  2967 0
 2963  2964 -2965 -601 -2968 0

c  2+1 --> break 
c    (-b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧  p_601) -> break
c  in CNF:
c     b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ -p_601 ∨ break
c  in DIMACS:
 2963 -2964  2965 -601 1162 0


c  2-1 --> 1
c    (-b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧ -p_601) -> (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0)
c  in CNF:
c     b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_2
c     b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_1
c     b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨  b^{1, 602}_0
c  in DIMACS:
 2963 -2964  2965  601 -2966 0
 2963 -2964  2965  601 -2967 0
 2963 -2964  2965  601  2968 0

c  1-1 --> 0
c    (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0 ∧ -p_601) -> (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧ -b^{1, 602}_0)
c  in CNF:
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_2
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_1
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_0
c  in DIMACS:
 2963  2964 -2965  601 -2966 0
 2963  2964 -2965  601 -2967 0
 2963  2964 -2965  601 -2968 0

c  0-1 --> -1
c    (-b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧ -p_601) -> ( b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0)
c  in CNF:
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨  b^{1, 602}_2
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_1
c     b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨  b^{1, 602}_0
c  in DIMACS:
 2963  2964  2965  601  2966 0
 2963  2964  2965  601 -2967 0
 2963  2964  2965  601  2968 0

c  -1-1 --> -2
c    ( b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧  b^{1, 601}_0 ∧ -p_601) -> ( b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0)
c  in CNF:
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨  b^{1, 602}_2
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨  b^{1, 602}_1
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨  p_601 ∨ -b^{1, 602}_0
c  in DIMACS:
-2963  2964 -2965  601  2966 0
-2963  2964 -2965  601  2967 0
-2963  2964 -2965  601 -2968 0

c  -2-1 --> break 
c    ( b^{1, 601}_2 ∧  b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧ -p_601) -> break
c  in CNF:
c    -b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨  b^{1, 601}_0 ∨  p_601 ∨ break
c  in DIMACS:
-2963 -2964  2965  601 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 601}_2 ∧ -b^{1, 601}_1 ∧ -b^{1, 601}_0 ∧ true) 
c  in CNF:
c    -b^{1, 601}_2 ∨  b^{1, 601}_1 ∨  b^{1, 601}_0 ∨ false 
c  in DIMACS:
-2963  2964  2965  0

c  3 does not represent an automaton state.
c    -(-b^{1, 601}_2 ∧  b^{1, 601}_1 ∧  b^{1, 601}_0 ∧ true) 
c  in CNF:
c     b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ false 
c  in DIMACS:
 2963 -2964 -2965  0
c  -3 does not represent an automaton state.
c    -( b^{1, 601}_2 ∧  b^{1, 601}_1 ∧  b^{1, 601}_0 ∧ true) 
c  in CNF:
c    -b^{1, 601}_2 ∨ -b^{1, 601}_1 ∨ -b^{1, 601}_0 ∨ false 
c  in DIMACS:
-2963 -2964 -2965  0

c i = 602
c  -2+1 --> -1
c    ( b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧  p_602) -> ( b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0)
c  in CNF:
c    -b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨  b^{1, 603}_2
c    -b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_1
c    -b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨  b^{1, 603}_0
c  in DIMACS:
-2966 -2967  2968 -602  2969 0
-2966 -2967  2968 -602 -2970 0
-2966 -2967  2968 -602  2971 0

c  -1+1 --> 0
c    ( b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0 ∧  p_602) -> (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧ -b^{1, 603}_0)
c  in CNF:
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_2
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_1
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_0
c  in DIMACS:
-2966  2967 -2968 -602 -2969 0
-2966  2967 -2968 -602 -2970 0
-2966  2967 -2968 -602 -2971 0

c  0+1 --> 1
c    (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧  p_602) -> (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0)
c  in CNF:
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_2
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_1
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨  b^{1, 603}_0
c  in DIMACS:
 2966  2967  2968 -602 -2969 0
 2966  2967  2968 -602 -2970 0
 2966  2967  2968 -602  2971 0

c  1+1 --> 2
c    (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0 ∧  p_602) -> (-b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0)
c  in CNF:
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_2
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨  b^{1, 603}_1
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ -p_602 ∨ -b^{1, 603}_0
c  in DIMACS:
 2966  2967 -2968 -602 -2969 0
 2966  2967 -2968 -602  2970 0
 2966  2967 -2968 -602 -2971 0

c  2+1 --> break 
c    (-b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧  p_602) -> break
c  in CNF:
c     b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 2966 -2967  2968 -602 1162 0


c  2-1 --> 1
c    (-b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧ -p_602) -> (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0)
c  in CNF:
c     b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_2
c     b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_1
c     b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨  b^{1, 603}_0
c  in DIMACS:
 2966 -2967  2968  602 -2969 0
 2966 -2967  2968  602 -2970 0
 2966 -2967  2968  602  2971 0

c  1-1 --> 0
c    (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0 ∧ -p_602) -> (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧ -b^{1, 603}_0)
c  in CNF:
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_2
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_1
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_0
c  in DIMACS:
 2966  2967 -2968  602 -2969 0
 2966  2967 -2968  602 -2970 0
 2966  2967 -2968  602 -2971 0

c  0-1 --> -1
c    (-b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧ -p_602) -> ( b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0)
c  in CNF:
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨  b^{1, 603}_2
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_1
c     b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨  b^{1, 603}_0
c  in DIMACS:
 2966  2967  2968  602  2969 0
 2966  2967  2968  602 -2970 0
 2966  2967  2968  602  2971 0

c  -1-1 --> -2
c    ( b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧  b^{1, 602}_0 ∧ -p_602) -> ( b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0)
c  in CNF:
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨  b^{1, 603}_2
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨  b^{1, 603}_1
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨  p_602 ∨ -b^{1, 603}_0
c  in DIMACS:
-2966  2967 -2968  602  2969 0
-2966  2967 -2968  602  2970 0
-2966  2967 -2968  602 -2971 0

c  -2-1 --> break 
c    ( b^{1, 602}_2 ∧  b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨  b^{1, 602}_0 ∨  p_602 ∨ break
c  in DIMACS:
-2966 -2967  2968  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 602}_2 ∧ -b^{1, 602}_1 ∧ -b^{1, 602}_0 ∧ true) 
c  in CNF:
c    -b^{1, 602}_2 ∨  b^{1, 602}_1 ∨  b^{1, 602}_0 ∨ false 
c  in DIMACS:
-2966  2967  2968  0

c  3 does not represent an automaton state.
c    -(-b^{1, 602}_2 ∧  b^{1, 602}_1 ∧  b^{1, 602}_0 ∧ true) 
c  in CNF:
c     b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ false 
c  in DIMACS:
 2966 -2967 -2968  0
c  -3 does not represent an automaton state.
c    -( b^{1, 602}_2 ∧  b^{1, 602}_1 ∧  b^{1, 602}_0 ∧ true) 
c  in CNF:
c    -b^{1, 602}_2 ∨ -b^{1, 602}_1 ∨ -b^{1, 602}_0 ∨ false 
c  in DIMACS:
-2966 -2967 -2968  0

c i = 603
c  -2+1 --> -1
c    ( b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧  p_603) -> ( b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0)
c  in CNF:
c    -b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨  b^{1, 604}_2
c    -b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_1
c    -b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨  b^{1, 604}_0
c  in DIMACS:
-2969 -2970  2971 -603  2972 0
-2969 -2970  2971 -603 -2973 0
-2969 -2970  2971 -603  2974 0

c  -1+1 --> 0
c    ( b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0 ∧  p_603) -> (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧ -b^{1, 604}_0)
c  in CNF:
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_2
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_1
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_0
c  in DIMACS:
-2969  2970 -2971 -603 -2972 0
-2969  2970 -2971 -603 -2973 0
-2969  2970 -2971 -603 -2974 0

c  0+1 --> 1
c    (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧  p_603) -> (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0)
c  in CNF:
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_2
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_1
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨  b^{1, 604}_0
c  in DIMACS:
 2969  2970  2971 -603 -2972 0
 2969  2970  2971 -603 -2973 0
 2969  2970  2971 -603  2974 0

c  1+1 --> 2
c    (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0 ∧  p_603) -> (-b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0)
c  in CNF:
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_2
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨  b^{1, 604}_1
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ -p_603 ∨ -b^{1, 604}_0
c  in DIMACS:
 2969  2970 -2971 -603 -2972 0
 2969  2970 -2971 -603  2973 0
 2969  2970 -2971 -603 -2974 0

c  2+1 --> break 
c    (-b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧  p_603) -> break
c  in CNF:
c     b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ -p_603 ∨ break
c  in DIMACS:
 2969 -2970  2971 -603 1162 0


c  2-1 --> 1
c    (-b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧ -p_603) -> (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0)
c  in CNF:
c     b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_2
c     b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_1
c     b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨  b^{1, 604}_0
c  in DIMACS:
 2969 -2970  2971  603 -2972 0
 2969 -2970  2971  603 -2973 0
 2969 -2970  2971  603  2974 0

c  1-1 --> 0
c    (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0 ∧ -p_603) -> (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧ -b^{1, 604}_0)
c  in CNF:
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_2
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_1
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_0
c  in DIMACS:
 2969  2970 -2971  603 -2972 0
 2969  2970 -2971  603 -2973 0
 2969  2970 -2971  603 -2974 0

c  0-1 --> -1
c    (-b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧ -p_603) -> ( b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0)
c  in CNF:
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨  b^{1, 604}_2
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_1
c     b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨  b^{1, 604}_0
c  in DIMACS:
 2969  2970  2971  603  2972 0
 2969  2970  2971  603 -2973 0
 2969  2970  2971  603  2974 0

c  -1-1 --> -2
c    ( b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧  b^{1, 603}_0 ∧ -p_603) -> ( b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0)
c  in CNF:
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨  b^{1, 604}_2
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨  b^{1, 604}_1
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨  p_603 ∨ -b^{1, 604}_0
c  in DIMACS:
-2969  2970 -2971  603  2972 0
-2969  2970 -2971  603  2973 0
-2969  2970 -2971  603 -2974 0

c  -2-1 --> break 
c    ( b^{1, 603}_2 ∧  b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧ -p_603) -> break
c  in CNF:
c    -b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨  b^{1, 603}_0 ∨  p_603 ∨ break
c  in DIMACS:
-2969 -2970  2971  603 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 603}_2 ∧ -b^{1, 603}_1 ∧ -b^{1, 603}_0 ∧ true) 
c  in CNF:
c    -b^{1, 603}_2 ∨  b^{1, 603}_1 ∨  b^{1, 603}_0 ∨ false 
c  in DIMACS:
-2969  2970  2971  0

c  3 does not represent an automaton state.
c    -(-b^{1, 603}_2 ∧  b^{1, 603}_1 ∧  b^{1, 603}_0 ∧ true) 
c  in CNF:
c     b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ false 
c  in DIMACS:
 2969 -2970 -2971  0
c  -3 does not represent an automaton state.
c    -( b^{1, 603}_2 ∧  b^{1, 603}_1 ∧  b^{1, 603}_0 ∧ true) 
c  in CNF:
c    -b^{1, 603}_2 ∨ -b^{1, 603}_1 ∨ -b^{1, 603}_0 ∨ false 
c  in DIMACS:
-2969 -2970 -2971  0

c i = 604
c  -2+1 --> -1
c    ( b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧  p_604) -> ( b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0)
c  in CNF:
c    -b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨  b^{1, 605}_2
c    -b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_1
c    -b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨  b^{1, 605}_0
c  in DIMACS:
-2972 -2973  2974 -604  2975 0
-2972 -2973  2974 -604 -2976 0
-2972 -2973  2974 -604  2977 0

c  -1+1 --> 0
c    ( b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0 ∧  p_604) -> (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧ -b^{1, 605}_0)
c  in CNF:
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_2
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_1
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_0
c  in DIMACS:
-2972  2973 -2974 -604 -2975 0
-2972  2973 -2974 -604 -2976 0
-2972  2973 -2974 -604 -2977 0

c  0+1 --> 1
c    (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧  p_604) -> (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0)
c  in CNF:
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_2
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_1
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨  b^{1, 605}_0
c  in DIMACS:
 2972  2973  2974 -604 -2975 0
 2972  2973  2974 -604 -2976 0
 2972  2973  2974 -604  2977 0

c  1+1 --> 2
c    (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0 ∧  p_604) -> (-b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0)
c  in CNF:
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_2
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨  b^{1, 605}_1
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ -p_604 ∨ -b^{1, 605}_0
c  in DIMACS:
 2972  2973 -2974 -604 -2975 0
 2972  2973 -2974 -604  2976 0
 2972  2973 -2974 -604 -2977 0

c  2+1 --> break 
c    (-b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧  p_604) -> break
c  in CNF:
c     b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ -p_604 ∨ break
c  in DIMACS:
 2972 -2973  2974 -604 1162 0


c  2-1 --> 1
c    (-b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧ -p_604) -> (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0)
c  in CNF:
c     b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_2
c     b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_1
c     b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨  b^{1, 605}_0
c  in DIMACS:
 2972 -2973  2974  604 -2975 0
 2972 -2973  2974  604 -2976 0
 2972 -2973  2974  604  2977 0

c  1-1 --> 0
c    (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0 ∧ -p_604) -> (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧ -b^{1, 605}_0)
c  in CNF:
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_2
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_1
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_0
c  in DIMACS:
 2972  2973 -2974  604 -2975 0
 2972  2973 -2974  604 -2976 0
 2972  2973 -2974  604 -2977 0

c  0-1 --> -1
c    (-b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧ -p_604) -> ( b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0)
c  in CNF:
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨  b^{1, 605}_2
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_1
c     b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨  b^{1, 605}_0
c  in DIMACS:
 2972  2973  2974  604  2975 0
 2972  2973  2974  604 -2976 0
 2972  2973  2974  604  2977 0

c  -1-1 --> -2
c    ( b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧  b^{1, 604}_0 ∧ -p_604) -> ( b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0)
c  in CNF:
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨  b^{1, 605}_2
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨  b^{1, 605}_1
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨  p_604 ∨ -b^{1, 605}_0
c  in DIMACS:
-2972  2973 -2974  604  2975 0
-2972  2973 -2974  604  2976 0
-2972  2973 -2974  604 -2977 0

c  -2-1 --> break 
c    ( b^{1, 604}_2 ∧  b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧ -p_604) -> break
c  in CNF:
c    -b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨  b^{1, 604}_0 ∨  p_604 ∨ break
c  in DIMACS:
-2972 -2973  2974  604 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 604}_2 ∧ -b^{1, 604}_1 ∧ -b^{1, 604}_0 ∧ true) 
c  in CNF:
c    -b^{1, 604}_2 ∨  b^{1, 604}_1 ∨  b^{1, 604}_0 ∨ false 
c  in DIMACS:
-2972  2973  2974  0

c  3 does not represent an automaton state.
c    -(-b^{1, 604}_2 ∧  b^{1, 604}_1 ∧  b^{1, 604}_0 ∧ true) 
c  in CNF:
c     b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ false 
c  in DIMACS:
 2972 -2973 -2974  0
c  -3 does not represent an automaton state.
c    -( b^{1, 604}_2 ∧  b^{1, 604}_1 ∧  b^{1, 604}_0 ∧ true) 
c  in CNF:
c    -b^{1, 604}_2 ∨ -b^{1, 604}_1 ∨ -b^{1, 604}_0 ∨ false 
c  in DIMACS:
-2972 -2973 -2974  0

c i = 605
c  -2+1 --> -1
c    ( b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧  p_605) -> ( b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0)
c  in CNF:
c    -b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨  b^{1, 606}_2
c    -b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_1
c    -b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨  b^{1, 606}_0
c  in DIMACS:
-2975 -2976  2977 -605  2978 0
-2975 -2976  2977 -605 -2979 0
-2975 -2976  2977 -605  2980 0

c  -1+1 --> 0
c    ( b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0 ∧  p_605) -> (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧ -b^{1, 606}_0)
c  in CNF:
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_2
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_1
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_0
c  in DIMACS:
-2975  2976 -2977 -605 -2978 0
-2975  2976 -2977 -605 -2979 0
-2975  2976 -2977 -605 -2980 0

c  0+1 --> 1
c    (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧  p_605) -> (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0)
c  in CNF:
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_2
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_1
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨  b^{1, 606}_0
c  in DIMACS:
 2975  2976  2977 -605 -2978 0
 2975  2976  2977 -605 -2979 0
 2975  2976  2977 -605  2980 0

c  1+1 --> 2
c    (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0 ∧  p_605) -> (-b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0)
c  in CNF:
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_2
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨  b^{1, 606}_1
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ -p_605 ∨ -b^{1, 606}_0
c  in DIMACS:
 2975  2976 -2977 -605 -2978 0
 2975  2976 -2977 -605  2979 0
 2975  2976 -2977 -605 -2980 0

c  2+1 --> break 
c    (-b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧  p_605) -> break
c  in CNF:
c     b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ -p_605 ∨ break
c  in DIMACS:
 2975 -2976  2977 -605 1162 0


c  2-1 --> 1
c    (-b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧ -p_605) -> (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0)
c  in CNF:
c     b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_2
c     b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_1
c     b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨  b^{1, 606}_0
c  in DIMACS:
 2975 -2976  2977  605 -2978 0
 2975 -2976  2977  605 -2979 0
 2975 -2976  2977  605  2980 0

c  1-1 --> 0
c    (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0 ∧ -p_605) -> (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧ -b^{1, 606}_0)
c  in CNF:
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_2
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_1
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_0
c  in DIMACS:
 2975  2976 -2977  605 -2978 0
 2975  2976 -2977  605 -2979 0
 2975  2976 -2977  605 -2980 0

c  0-1 --> -1
c    (-b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧ -p_605) -> ( b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0)
c  in CNF:
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨  b^{1, 606}_2
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_1
c     b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨  b^{1, 606}_0
c  in DIMACS:
 2975  2976  2977  605  2978 0
 2975  2976  2977  605 -2979 0
 2975  2976  2977  605  2980 0

c  -1-1 --> -2
c    ( b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧  b^{1, 605}_0 ∧ -p_605) -> ( b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0)
c  in CNF:
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨  b^{1, 606}_2
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨  b^{1, 606}_1
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨  p_605 ∨ -b^{1, 606}_0
c  in DIMACS:
-2975  2976 -2977  605  2978 0
-2975  2976 -2977  605  2979 0
-2975  2976 -2977  605 -2980 0

c  -2-1 --> break 
c    ( b^{1, 605}_2 ∧  b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧ -p_605) -> break
c  in CNF:
c    -b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨  b^{1, 605}_0 ∨  p_605 ∨ break
c  in DIMACS:
-2975 -2976  2977  605 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 605}_2 ∧ -b^{1, 605}_1 ∧ -b^{1, 605}_0 ∧ true) 
c  in CNF:
c    -b^{1, 605}_2 ∨  b^{1, 605}_1 ∨  b^{1, 605}_0 ∨ false 
c  in DIMACS:
-2975  2976  2977  0

c  3 does not represent an automaton state.
c    -(-b^{1, 605}_2 ∧  b^{1, 605}_1 ∧  b^{1, 605}_0 ∧ true) 
c  in CNF:
c     b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ false 
c  in DIMACS:
 2975 -2976 -2977  0
c  -3 does not represent an automaton state.
c    -( b^{1, 605}_2 ∧  b^{1, 605}_1 ∧  b^{1, 605}_0 ∧ true) 
c  in CNF:
c    -b^{1, 605}_2 ∨ -b^{1, 605}_1 ∨ -b^{1, 605}_0 ∨ false 
c  in DIMACS:
-2975 -2976 -2977  0

c i = 606
c  -2+1 --> -1
c    ( b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧  p_606) -> ( b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0)
c  in CNF:
c    -b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨  b^{1, 607}_2
c    -b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_1
c    -b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨  b^{1, 607}_0
c  in DIMACS:
-2978 -2979  2980 -606  2981 0
-2978 -2979  2980 -606 -2982 0
-2978 -2979  2980 -606  2983 0

c  -1+1 --> 0
c    ( b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0 ∧  p_606) -> (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧ -b^{1, 607}_0)
c  in CNF:
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_2
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_1
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_0
c  in DIMACS:
-2978  2979 -2980 -606 -2981 0
-2978  2979 -2980 -606 -2982 0
-2978  2979 -2980 -606 -2983 0

c  0+1 --> 1
c    (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧  p_606) -> (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0)
c  in CNF:
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_2
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_1
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨  b^{1, 607}_0
c  in DIMACS:
 2978  2979  2980 -606 -2981 0
 2978  2979  2980 -606 -2982 0
 2978  2979  2980 -606  2983 0

c  1+1 --> 2
c    (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0 ∧  p_606) -> (-b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0)
c  in CNF:
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_2
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨  b^{1, 607}_1
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ -p_606 ∨ -b^{1, 607}_0
c  in DIMACS:
 2978  2979 -2980 -606 -2981 0
 2978  2979 -2980 -606  2982 0
 2978  2979 -2980 -606 -2983 0

c  2+1 --> break 
c    (-b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧  p_606) -> break
c  in CNF:
c     b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 2978 -2979  2980 -606 1162 0


c  2-1 --> 1
c    (-b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧ -p_606) -> (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0)
c  in CNF:
c     b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_2
c     b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_1
c     b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨  b^{1, 607}_0
c  in DIMACS:
 2978 -2979  2980  606 -2981 0
 2978 -2979  2980  606 -2982 0
 2978 -2979  2980  606  2983 0

c  1-1 --> 0
c    (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0 ∧ -p_606) -> (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧ -b^{1, 607}_0)
c  in CNF:
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_2
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_1
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_0
c  in DIMACS:
 2978  2979 -2980  606 -2981 0
 2978  2979 -2980  606 -2982 0
 2978  2979 -2980  606 -2983 0

c  0-1 --> -1
c    (-b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧ -p_606) -> ( b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0)
c  in CNF:
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨  b^{1, 607}_2
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_1
c     b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨  b^{1, 607}_0
c  in DIMACS:
 2978  2979  2980  606  2981 0
 2978  2979  2980  606 -2982 0
 2978  2979  2980  606  2983 0

c  -1-1 --> -2
c    ( b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧  b^{1, 606}_0 ∧ -p_606) -> ( b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0)
c  in CNF:
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨  b^{1, 607}_2
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨  b^{1, 607}_1
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨  p_606 ∨ -b^{1, 607}_0
c  in DIMACS:
-2978  2979 -2980  606  2981 0
-2978  2979 -2980  606  2982 0
-2978  2979 -2980  606 -2983 0

c  -2-1 --> break 
c    ( b^{1, 606}_2 ∧  b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨  b^{1, 606}_0 ∨  p_606 ∨ break
c  in DIMACS:
-2978 -2979  2980  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 606}_2 ∧ -b^{1, 606}_1 ∧ -b^{1, 606}_0 ∧ true) 
c  in CNF:
c    -b^{1, 606}_2 ∨  b^{1, 606}_1 ∨  b^{1, 606}_0 ∨ false 
c  in DIMACS:
-2978  2979  2980  0

c  3 does not represent an automaton state.
c    -(-b^{1, 606}_2 ∧  b^{1, 606}_1 ∧  b^{1, 606}_0 ∧ true) 
c  in CNF:
c     b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ false 
c  in DIMACS:
 2978 -2979 -2980  0
c  -3 does not represent an automaton state.
c    -( b^{1, 606}_2 ∧  b^{1, 606}_1 ∧  b^{1, 606}_0 ∧ true) 
c  in CNF:
c    -b^{1, 606}_2 ∨ -b^{1, 606}_1 ∨ -b^{1, 606}_0 ∨ false 
c  in DIMACS:
-2978 -2979 -2980  0

c i = 607
c  -2+1 --> -1
c    ( b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧  p_607) -> ( b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0)
c  in CNF:
c    -b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨  b^{1, 608}_2
c    -b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_1
c    -b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨  b^{1, 608}_0
c  in DIMACS:
-2981 -2982  2983 -607  2984 0
-2981 -2982  2983 -607 -2985 0
-2981 -2982  2983 -607  2986 0

c  -1+1 --> 0
c    ( b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0 ∧  p_607) -> (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧ -b^{1, 608}_0)
c  in CNF:
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_2
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_1
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_0
c  in DIMACS:
-2981  2982 -2983 -607 -2984 0
-2981  2982 -2983 -607 -2985 0
-2981  2982 -2983 -607 -2986 0

c  0+1 --> 1
c    (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧  p_607) -> (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0)
c  in CNF:
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_2
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_1
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨  b^{1, 608}_0
c  in DIMACS:
 2981  2982  2983 -607 -2984 0
 2981  2982  2983 -607 -2985 0
 2981  2982  2983 -607  2986 0

c  1+1 --> 2
c    (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0 ∧  p_607) -> (-b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0)
c  in CNF:
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_2
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨  b^{1, 608}_1
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ -p_607 ∨ -b^{1, 608}_0
c  in DIMACS:
 2981  2982 -2983 -607 -2984 0
 2981  2982 -2983 -607  2985 0
 2981  2982 -2983 -607 -2986 0

c  2+1 --> break 
c    (-b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧  p_607) -> break
c  in CNF:
c     b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ -p_607 ∨ break
c  in DIMACS:
 2981 -2982  2983 -607 1162 0


c  2-1 --> 1
c    (-b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧ -p_607) -> (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0)
c  in CNF:
c     b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_2
c     b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_1
c     b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨  b^{1, 608}_0
c  in DIMACS:
 2981 -2982  2983  607 -2984 0
 2981 -2982  2983  607 -2985 0
 2981 -2982  2983  607  2986 0

c  1-1 --> 0
c    (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0 ∧ -p_607) -> (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧ -b^{1, 608}_0)
c  in CNF:
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_2
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_1
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_0
c  in DIMACS:
 2981  2982 -2983  607 -2984 0
 2981  2982 -2983  607 -2985 0
 2981  2982 -2983  607 -2986 0

c  0-1 --> -1
c    (-b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧ -p_607) -> ( b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0)
c  in CNF:
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨  b^{1, 608}_2
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_1
c     b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨  b^{1, 608}_0
c  in DIMACS:
 2981  2982  2983  607  2984 0
 2981  2982  2983  607 -2985 0
 2981  2982  2983  607  2986 0

c  -1-1 --> -2
c    ( b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧  b^{1, 607}_0 ∧ -p_607) -> ( b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0)
c  in CNF:
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨  b^{1, 608}_2
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨  b^{1, 608}_1
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨  p_607 ∨ -b^{1, 608}_0
c  in DIMACS:
-2981  2982 -2983  607  2984 0
-2981  2982 -2983  607  2985 0
-2981  2982 -2983  607 -2986 0

c  -2-1 --> break 
c    ( b^{1, 607}_2 ∧  b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧ -p_607) -> break
c  in CNF:
c    -b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨  b^{1, 607}_0 ∨  p_607 ∨ break
c  in DIMACS:
-2981 -2982  2983  607 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 607}_2 ∧ -b^{1, 607}_1 ∧ -b^{1, 607}_0 ∧ true) 
c  in CNF:
c    -b^{1, 607}_2 ∨  b^{1, 607}_1 ∨  b^{1, 607}_0 ∨ false 
c  in DIMACS:
-2981  2982  2983  0

c  3 does not represent an automaton state.
c    -(-b^{1, 607}_2 ∧  b^{1, 607}_1 ∧  b^{1, 607}_0 ∧ true) 
c  in CNF:
c     b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ false 
c  in DIMACS:
 2981 -2982 -2983  0
c  -3 does not represent an automaton state.
c    -( b^{1, 607}_2 ∧  b^{1, 607}_1 ∧  b^{1, 607}_0 ∧ true) 
c  in CNF:
c    -b^{1, 607}_2 ∨ -b^{1, 607}_1 ∨ -b^{1, 607}_0 ∨ false 
c  in DIMACS:
-2981 -2982 -2983  0

c i = 608
c  -2+1 --> -1
c    ( b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧  p_608) -> ( b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0)
c  in CNF:
c    -b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨  b^{1, 609}_2
c    -b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_1
c    -b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨  b^{1, 609}_0
c  in DIMACS:
-2984 -2985  2986 -608  2987 0
-2984 -2985  2986 -608 -2988 0
-2984 -2985  2986 -608  2989 0

c  -1+1 --> 0
c    ( b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0 ∧  p_608) -> (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧ -b^{1, 609}_0)
c  in CNF:
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_2
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_1
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_0
c  in DIMACS:
-2984  2985 -2986 -608 -2987 0
-2984  2985 -2986 -608 -2988 0
-2984  2985 -2986 -608 -2989 0

c  0+1 --> 1
c    (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧  p_608) -> (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0)
c  in CNF:
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_2
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_1
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨  b^{1, 609}_0
c  in DIMACS:
 2984  2985  2986 -608 -2987 0
 2984  2985  2986 -608 -2988 0
 2984  2985  2986 -608  2989 0

c  1+1 --> 2
c    (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0 ∧  p_608) -> (-b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0)
c  in CNF:
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_2
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨  b^{1, 609}_1
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ -p_608 ∨ -b^{1, 609}_0
c  in DIMACS:
 2984  2985 -2986 -608 -2987 0
 2984  2985 -2986 -608  2988 0
 2984  2985 -2986 -608 -2989 0

c  2+1 --> break 
c    (-b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧  p_608) -> break
c  in CNF:
c     b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 2984 -2985  2986 -608 1162 0


c  2-1 --> 1
c    (-b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧ -p_608) -> (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0)
c  in CNF:
c     b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_2
c     b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_1
c     b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨  b^{1, 609}_0
c  in DIMACS:
 2984 -2985  2986  608 -2987 0
 2984 -2985  2986  608 -2988 0
 2984 -2985  2986  608  2989 0

c  1-1 --> 0
c    (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0 ∧ -p_608) -> (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧ -b^{1, 609}_0)
c  in CNF:
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_2
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_1
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_0
c  in DIMACS:
 2984  2985 -2986  608 -2987 0
 2984  2985 -2986  608 -2988 0
 2984  2985 -2986  608 -2989 0

c  0-1 --> -1
c    (-b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧ -p_608) -> ( b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0)
c  in CNF:
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨  b^{1, 609}_2
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_1
c     b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨  b^{1, 609}_0
c  in DIMACS:
 2984  2985  2986  608  2987 0
 2984  2985  2986  608 -2988 0
 2984  2985  2986  608  2989 0

c  -1-1 --> -2
c    ( b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧  b^{1, 608}_0 ∧ -p_608) -> ( b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0)
c  in CNF:
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨  b^{1, 609}_2
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨  b^{1, 609}_1
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨  p_608 ∨ -b^{1, 609}_0
c  in DIMACS:
-2984  2985 -2986  608  2987 0
-2984  2985 -2986  608  2988 0
-2984  2985 -2986  608 -2989 0

c  -2-1 --> break 
c    ( b^{1, 608}_2 ∧  b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨  b^{1, 608}_0 ∨  p_608 ∨ break
c  in DIMACS:
-2984 -2985  2986  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 608}_2 ∧ -b^{1, 608}_1 ∧ -b^{1, 608}_0 ∧ true) 
c  in CNF:
c    -b^{1, 608}_2 ∨  b^{1, 608}_1 ∨  b^{1, 608}_0 ∨ false 
c  in DIMACS:
-2984  2985  2986  0

c  3 does not represent an automaton state.
c    -(-b^{1, 608}_2 ∧  b^{1, 608}_1 ∧  b^{1, 608}_0 ∧ true) 
c  in CNF:
c     b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ false 
c  in DIMACS:
 2984 -2985 -2986  0
c  -3 does not represent an automaton state.
c    -( b^{1, 608}_2 ∧  b^{1, 608}_1 ∧  b^{1, 608}_0 ∧ true) 
c  in CNF:
c    -b^{1, 608}_2 ∨ -b^{1, 608}_1 ∨ -b^{1, 608}_0 ∨ false 
c  in DIMACS:
-2984 -2985 -2986  0

c i = 609
c  -2+1 --> -1
c    ( b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧  p_609) -> ( b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0)
c  in CNF:
c    -b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨  b^{1, 610}_2
c    -b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_1
c    -b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨  b^{1, 610}_0
c  in DIMACS:
-2987 -2988  2989 -609  2990 0
-2987 -2988  2989 -609 -2991 0
-2987 -2988  2989 -609  2992 0

c  -1+1 --> 0
c    ( b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0 ∧  p_609) -> (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧ -b^{1, 610}_0)
c  in CNF:
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_2
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_1
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_0
c  in DIMACS:
-2987  2988 -2989 -609 -2990 0
-2987  2988 -2989 -609 -2991 0
-2987  2988 -2989 -609 -2992 0

c  0+1 --> 1
c    (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧  p_609) -> (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0)
c  in CNF:
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_2
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_1
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨  b^{1, 610}_0
c  in DIMACS:
 2987  2988  2989 -609 -2990 0
 2987  2988  2989 -609 -2991 0
 2987  2988  2989 -609  2992 0

c  1+1 --> 2
c    (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0 ∧  p_609) -> (-b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0)
c  in CNF:
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_2
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨  b^{1, 610}_1
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ -p_609 ∨ -b^{1, 610}_0
c  in DIMACS:
 2987  2988 -2989 -609 -2990 0
 2987  2988 -2989 -609  2991 0
 2987  2988 -2989 -609 -2992 0

c  2+1 --> break 
c    (-b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧  p_609) -> break
c  in CNF:
c     b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 2987 -2988  2989 -609 1162 0


c  2-1 --> 1
c    (-b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧ -p_609) -> (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0)
c  in CNF:
c     b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_2
c     b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_1
c     b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨  b^{1, 610}_0
c  in DIMACS:
 2987 -2988  2989  609 -2990 0
 2987 -2988  2989  609 -2991 0
 2987 -2988  2989  609  2992 0

c  1-1 --> 0
c    (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0 ∧ -p_609) -> (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧ -b^{1, 610}_0)
c  in CNF:
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_2
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_1
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_0
c  in DIMACS:
 2987  2988 -2989  609 -2990 0
 2987  2988 -2989  609 -2991 0
 2987  2988 -2989  609 -2992 0

c  0-1 --> -1
c    (-b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧ -p_609) -> ( b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0)
c  in CNF:
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨  b^{1, 610}_2
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_1
c     b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨  b^{1, 610}_0
c  in DIMACS:
 2987  2988  2989  609  2990 0
 2987  2988  2989  609 -2991 0
 2987  2988  2989  609  2992 0

c  -1-1 --> -2
c    ( b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧  b^{1, 609}_0 ∧ -p_609) -> ( b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0)
c  in CNF:
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨  b^{1, 610}_2
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨  b^{1, 610}_1
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨  p_609 ∨ -b^{1, 610}_0
c  in DIMACS:
-2987  2988 -2989  609  2990 0
-2987  2988 -2989  609  2991 0
-2987  2988 -2989  609 -2992 0

c  -2-1 --> break 
c    ( b^{1, 609}_2 ∧  b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨  b^{1, 609}_0 ∨  p_609 ∨ break
c  in DIMACS:
-2987 -2988  2989  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 609}_2 ∧ -b^{1, 609}_1 ∧ -b^{1, 609}_0 ∧ true) 
c  in CNF:
c    -b^{1, 609}_2 ∨  b^{1, 609}_1 ∨  b^{1, 609}_0 ∨ false 
c  in DIMACS:
-2987  2988  2989  0

c  3 does not represent an automaton state.
c    -(-b^{1, 609}_2 ∧  b^{1, 609}_1 ∧  b^{1, 609}_0 ∧ true) 
c  in CNF:
c     b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ false 
c  in DIMACS:
 2987 -2988 -2989  0
c  -3 does not represent an automaton state.
c    -( b^{1, 609}_2 ∧  b^{1, 609}_1 ∧  b^{1, 609}_0 ∧ true) 
c  in CNF:
c    -b^{1, 609}_2 ∨ -b^{1, 609}_1 ∨ -b^{1, 609}_0 ∨ false 
c  in DIMACS:
-2987 -2988 -2989  0

c i = 610
c  -2+1 --> -1
c    ( b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧  p_610) -> ( b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0)
c  in CNF:
c    -b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨  b^{1, 611}_2
c    -b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_1
c    -b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨  b^{1, 611}_0
c  in DIMACS:
-2990 -2991  2992 -610  2993 0
-2990 -2991  2992 -610 -2994 0
-2990 -2991  2992 -610  2995 0

c  -1+1 --> 0
c    ( b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0 ∧  p_610) -> (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧ -b^{1, 611}_0)
c  in CNF:
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_2
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_1
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_0
c  in DIMACS:
-2990  2991 -2992 -610 -2993 0
-2990  2991 -2992 -610 -2994 0
-2990  2991 -2992 -610 -2995 0

c  0+1 --> 1
c    (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧  p_610) -> (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0)
c  in CNF:
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_2
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_1
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨  b^{1, 611}_0
c  in DIMACS:
 2990  2991  2992 -610 -2993 0
 2990  2991  2992 -610 -2994 0
 2990  2991  2992 -610  2995 0

c  1+1 --> 2
c    (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0 ∧  p_610) -> (-b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0)
c  in CNF:
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_2
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨  b^{1, 611}_1
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ -p_610 ∨ -b^{1, 611}_0
c  in DIMACS:
 2990  2991 -2992 -610 -2993 0
 2990  2991 -2992 -610  2994 0
 2990  2991 -2992 -610 -2995 0

c  2+1 --> break 
c    (-b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧  p_610) -> break
c  in CNF:
c     b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 2990 -2991  2992 -610 1162 0


c  2-1 --> 1
c    (-b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧ -p_610) -> (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0)
c  in CNF:
c     b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_2
c     b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_1
c     b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨  b^{1, 611}_0
c  in DIMACS:
 2990 -2991  2992  610 -2993 0
 2990 -2991  2992  610 -2994 0
 2990 -2991  2992  610  2995 0

c  1-1 --> 0
c    (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0 ∧ -p_610) -> (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧ -b^{1, 611}_0)
c  in CNF:
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_2
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_1
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_0
c  in DIMACS:
 2990  2991 -2992  610 -2993 0
 2990  2991 -2992  610 -2994 0
 2990  2991 -2992  610 -2995 0

c  0-1 --> -1
c    (-b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧ -p_610) -> ( b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0)
c  in CNF:
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨  b^{1, 611}_2
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_1
c     b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨  b^{1, 611}_0
c  in DIMACS:
 2990  2991  2992  610  2993 0
 2990  2991  2992  610 -2994 0
 2990  2991  2992  610  2995 0

c  -1-1 --> -2
c    ( b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧  b^{1, 610}_0 ∧ -p_610) -> ( b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0)
c  in CNF:
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨  b^{1, 611}_2
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨  b^{1, 611}_1
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨  p_610 ∨ -b^{1, 611}_0
c  in DIMACS:
-2990  2991 -2992  610  2993 0
-2990  2991 -2992  610  2994 0
-2990  2991 -2992  610 -2995 0

c  -2-1 --> break 
c    ( b^{1, 610}_2 ∧  b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨  b^{1, 610}_0 ∨  p_610 ∨ break
c  in DIMACS:
-2990 -2991  2992  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 610}_2 ∧ -b^{1, 610}_1 ∧ -b^{1, 610}_0 ∧ true) 
c  in CNF:
c    -b^{1, 610}_2 ∨  b^{1, 610}_1 ∨  b^{1, 610}_0 ∨ false 
c  in DIMACS:
-2990  2991  2992  0

c  3 does not represent an automaton state.
c    -(-b^{1, 610}_2 ∧  b^{1, 610}_1 ∧  b^{1, 610}_0 ∧ true) 
c  in CNF:
c     b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ false 
c  in DIMACS:
 2990 -2991 -2992  0
c  -3 does not represent an automaton state.
c    -( b^{1, 610}_2 ∧  b^{1, 610}_1 ∧  b^{1, 610}_0 ∧ true) 
c  in CNF:
c    -b^{1, 610}_2 ∨ -b^{1, 610}_1 ∨ -b^{1, 610}_0 ∨ false 
c  in DIMACS:
-2990 -2991 -2992  0

c i = 611
c  -2+1 --> -1
c    ( b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧  p_611) -> ( b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0)
c  in CNF:
c    -b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨  b^{1, 612}_2
c    -b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_1
c    -b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨  b^{1, 612}_0
c  in DIMACS:
-2993 -2994  2995 -611  2996 0
-2993 -2994  2995 -611 -2997 0
-2993 -2994  2995 -611  2998 0

c  -1+1 --> 0
c    ( b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0 ∧  p_611) -> (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧ -b^{1, 612}_0)
c  in CNF:
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_2
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_1
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_0
c  in DIMACS:
-2993  2994 -2995 -611 -2996 0
-2993  2994 -2995 -611 -2997 0
-2993  2994 -2995 -611 -2998 0

c  0+1 --> 1
c    (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧  p_611) -> (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0)
c  in CNF:
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_2
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_1
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨  b^{1, 612}_0
c  in DIMACS:
 2993  2994  2995 -611 -2996 0
 2993  2994  2995 -611 -2997 0
 2993  2994  2995 -611  2998 0

c  1+1 --> 2
c    (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0 ∧  p_611) -> (-b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0)
c  in CNF:
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_2
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨  b^{1, 612}_1
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ -p_611 ∨ -b^{1, 612}_0
c  in DIMACS:
 2993  2994 -2995 -611 -2996 0
 2993  2994 -2995 -611  2997 0
 2993  2994 -2995 -611 -2998 0

c  2+1 --> break 
c    (-b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧  p_611) -> break
c  in CNF:
c     b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ -p_611 ∨ break
c  in DIMACS:
 2993 -2994  2995 -611 1162 0


c  2-1 --> 1
c    (-b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧ -p_611) -> (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0)
c  in CNF:
c     b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_2
c     b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_1
c     b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨  b^{1, 612}_0
c  in DIMACS:
 2993 -2994  2995  611 -2996 0
 2993 -2994  2995  611 -2997 0
 2993 -2994  2995  611  2998 0

c  1-1 --> 0
c    (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0 ∧ -p_611) -> (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧ -b^{1, 612}_0)
c  in CNF:
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_2
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_1
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_0
c  in DIMACS:
 2993  2994 -2995  611 -2996 0
 2993  2994 -2995  611 -2997 0
 2993  2994 -2995  611 -2998 0

c  0-1 --> -1
c    (-b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧ -p_611) -> ( b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0)
c  in CNF:
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨  b^{1, 612}_2
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_1
c     b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨  b^{1, 612}_0
c  in DIMACS:
 2993  2994  2995  611  2996 0
 2993  2994  2995  611 -2997 0
 2993  2994  2995  611  2998 0

c  -1-1 --> -2
c    ( b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧  b^{1, 611}_0 ∧ -p_611) -> ( b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0)
c  in CNF:
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨  b^{1, 612}_2
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨  b^{1, 612}_1
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨  p_611 ∨ -b^{1, 612}_0
c  in DIMACS:
-2993  2994 -2995  611  2996 0
-2993  2994 -2995  611  2997 0
-2993  2994 -2995  611 -2998 0

c  -2-1 --> break 
c    ( b^{1, 611}_2 ∧  b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧ -p_611) -> break
c  in CNF:
c    -b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨  b^{1, 611}_0 ∨  p_611 ∨ break
c  in DIMACS:
-2993 -2994  2995  611 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 611}_2 ∧ -b^{1, 611}_1 ∧ -b^{1, 611}_0 ∧ true) 
c  in CNF:
c    -b^{1, 611}_2 ∨  b^{1, 611}_1 ∨  b^{1, 611}_0 ∨ false 
c  in DIMACS:
-2993  2994  2995  0

c  3 does not represent an automaton state.
c    -(-b^{1, 611}_2 ∧  b^{1, 611}_1 ∧  b^{1, 611}_0 ∧ true) 
c  in CNF:
c     b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ false 
c  in DIMACS:
 2993 -2994 -2995  0
c  -3 does not represent an automaton state.
c    -( b^{1, 611}_2 ∧  b^{1, 611}_1 ∧  b^{1, 611}_0 ∧ true) 
c  in CNF:
c    -b^{1, 611}_2 ∨ -b^{1, 611}_1 ∨ -b^{1, 611}_0 ∨ false 
c  in DIMACS:
-2993 -2994 -2995  0

c i = 612
c  -2+1 --> -1
c    ( b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧  p_612) -> ( b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0)
c  in CNF:
c    -b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨  b^{1, 613}_2
c    -b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_1
c    -b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨  b^{1, 613}_0
c  in DIMACS:
-2996 -2997  2998 -612  2999 0
-2996 -2997  2998 -612 -3000 0
-2996 -2997  2998 -612  3001 0

c  -1+1 --> 0
c    ( b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0 ∧  p_612) -> (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧ -b^{1, 613}_0)
c  in CNF:
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_2
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_1
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_0
c  in DIMACS:
-2996  2997 -2998 -612 -2999 0
-2996  2997 -2998 -612 -3000 0
-2996  2997 -2998 -612 -3001 0

c  0+1 --> 1
c    (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧  p_612) -> (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0)
c  in CNF:
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_2
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_1
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨  b^{1, 613}_0
c  in DIMACS:
 2996  2997  2998 -612 -2999 0
 2996  2997  2998 -612 -3000 0
 2996  2997  2998 -612  3001 0

c  1+1 --> 2
c    (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0 ∧  p_612) -> (-b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0)
c  in CNF:
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_2
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨  b^{1, 613}_1
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ -p_612 ∨ -b^{1, 613}_0
c  in DIMACS:
 2996  2997 -2998 -612 -2999 0
 2996  2997 -2998 -612  3000 0
 2996  2997 -2998 -612 -3001 0

c  2+1 --> break 
c    (-b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧  p_612) -> break
c  in CNF:
c     b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 2996 -2997  2998 -612 1162 0


c  2-1 --> 1
c    (-b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧ -p_612) -> (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0)
c  in CNF:
c     b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_2
c     b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_1
c     b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨  b^{1, 613}_0
c  in DIMACS:
 2996 -2997  2998  612 -2999 0
 2996 -2997  2998  612 -3000 0
 2996 -2997  2998  612  3001 0

c  1-1 --> 0
c    (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0 ∧ -p_612) -> (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧ -b^{1, 613}_0)
c  in CNF:
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_2
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_1
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_0
c  in DIMACS:
 2996  2997 -2998  612 -2999 0
 2996  2997 -2998  612 -3000 0
 2996  2997 -2998  612 -3001 0

c  0-1 --> -1
c    (-b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧ -p_612) -> ( b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0)
c  in CNF:
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨  b^{1, 613}_2
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_1
c     b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨  b^{1, 613}_0
c  in DIMACS:
 2996  2997  2998  612  2999 0
 2996  2997  2998  612 -3000 0
 2996  2997  2998  612  3001 0

c  -1-1 --> -2
c    ( b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧  b^{1, 612}_0 ∧ -p_612) -> ( b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0)
c  in CNF:
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨  b^{1, 613}_2
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨  b^{1, 613}_1
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨  p_612 ∨ -b^{1, 613}_0
c  in DIMACS:
-2996  2997 -2998  612  2999 0
-2996  2997 -2998  612  3000 0
-2996  2997 -2998  612 -3001 0

c  -2-1 --> break 
c    ( b^{1, 612}_2 ∧  b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨  b^{1, 612}_0 ∨  p_612 ∨ break
c  in DIMACS:
-2996 -2997  2998  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 612}_2 ∧ -b^{1, 612}_1 ∧ -b^{1, 612}_0 ∧ true) 
c  in CNF:
c    -b^{1, 612}_2 ∨  b^{1, 612}_1 ∨  b^{1, 612}_0 ∨ false 
c  in DIMACS:
-2996  2997  2998  0

c  3 does not represent an automaton state.
c    -(-b^{1, 612}_2 ∧  b^{1, 612}_1 ∧  b^{1, 612}_0 ∧ true) 
c  in CNF:
c     b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ false 
c  in DIMACS:
 2996 -2997 -2998  0
c  -3 does not represent an automaton state.
c    -( b^{1, 612}_2 ∧  b^{1, 612}_1 ∧  b^{1, 612}_0 ∧ true) 
c  in CNF:
c    -b^{1, 612}_2 ∨ -b^{1, 612}_1 ∨ -b^{1, 612}_0 ∨ false 
c  in DIMACS:
-2996 -2997 -2998  0

c i = 613
c  -2+1 --> -1
c    ( b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧  p_613) -> ( b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0)
c  in CNF:
c    -b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨  b^{1, 614}_2
c    -b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_1
c    -b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨  b^{1, 614}_0
c  in DIMACS:
-2999 -3000  3001 -613  3002 0
-2999 -3000  3001 -613 -3003 0
-2999 -3000  3001 -613  3004 0

c  -1+1 --> 0
c    ( b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0 ∧  p_613) -> (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧ -b^{1, 614}_0)
c  in CNF:
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_2
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_1
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_0
c  in DIMACS:
-2999  3000 -3001 -613 -3002 0
-2999  3000 -3001 -613 -3003 0
-2999  3000 -3001 -613 -3004 0

c  0+1 --> 1
c    (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧  p_613) -> (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0)
c  in CNF:
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_2
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_1
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨  b^{1, 614}_0
c  in DIMACS:
 2999  3000  3001 -613 -3002 0
 2999  3000  3001 -613 -3003 0
 2999  3000  3001 -613  3004 0

c  1+1 --> 2
c    (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0 ∧  p_613) -> (-b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0)
c  in CNF:
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_2
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨  b^{1, 614}_1
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ -p_613 ∨ -b^{1, 614}_0
c  in DIMACS:
 2999  3000 -3001 -613 -3002 0
 2999  3000 -3001 -613  3003 0
 2999  3000 -3001 -613 -3004 0

c  2+1 --> break 
c    (-b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧  p_613) -> break
c  in CNF:
c     b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ -p_613 ∨ break
c  in DIMACS:
 2999 -3000  3001 -613 1162 0


c  2-1 --> 1
c    (-b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧ -p_613) -> (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0)
c  in CNF:
c     b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_2
c     b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_1
c     b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨  b^{1, 614}_0
c  in DIMACS:
 2999 -3000  3001  613 -3002 0
 2999 -3000  3001  613 -3003 0
 2999 -3000  3001  613  3004 0

c  1-1 --> 0
c    (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0 ∧ -p_613) -> (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧ -b^{1, 614}_0)
c  in CNF:
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_2
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_1
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_0
c  in DIMACS:
 2999  3000 -3001  613 -3002 0
 2999  3000 -3001  613 -3003 0
 2999  3000 -3001  613 -3004 0

c  0-1 --> -1
c    (-b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧ -p_613) -> ( b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0)
c  in CNF:
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨  b^{1, 614}_2
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_1
c     b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨  b^{1, 614}_0
c  in DIMACS:
 2999  3000  3001  613  3002 0
 2999  3000  3001  613 -3003 0
 2999  3000  3001  613  3004 0

c  -1-1 --> -2
c    ( b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧  b^{1, 613}_0 ∧ -p_613) -> ( b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0)
c  in CNF:
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨  b^{1, 614}_2
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨  b^{1, 614}_1
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨  p_613 ∨ -b^{1, 614}_0
c  in DIMACS:
-2999  3000 -3001  613  3002 0
-2999  3000 -3001  613  3003 0
-2999  3000 -3001  613 -3004 0

c  -2-1 --> break 
c    ( b^{1, 613}_2 ∧  b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧ -p_613) -> break
c  in CNF:
c    -b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨  b^{1, 613}_0 ∨  p_613 ∨ break
c  in DIMACS:
-2999 -3000  3001  613 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 613}_2 ∧ -b^{1, 613}_1 ∧ -b^{1, 613}_0 ∧ true) 
c  in CNF:
c    -b^{1, 613}_2 ∨  b^{1, 613}_1 ∨  b^{1, 613}_0 ∨ false 
c  in DIMACS:
-2999  3000  3001  0

c  3 does not represent an automaton state.
c    -(-b^{1, 613}_2 ∧  b^{1, 613}_1 ∧  b^{1, 613}_0 ∧ true) 
c  in CNF:
c     b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ false 
c  in DIMACS:
 2999 -3000 -3001  0
c  -3 does not represent an automaton state.
c    -( b^{1, 613}_2 ∧  b^{1, 613}_1 ∧  b^{1, 613}_0 ∧ true) 
c  in CNF:
c    -b^{1, 613}_2 ∨ -b^{1, 613}_1 ∨ -b^{1, 613}_0 ∨ false 
c  in DIMACS:
-2999 -3000 -3001  0

c i = 614
c  -2+1 --> -1
c    ( b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧  p_614) -> ( b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0)
c  in CNF:
c    -b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨  b^{1, 615}_2
c    -b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_1
c    -b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨  b^{1, 615}_0
c  in DIMACS:
-3002 -3003  3004 -614  3005 0
-3002 -3003  3004 -614 -3006 0
-3002 -3003  3004 -614  3007 0

c  -1+1 --> 0
c    ( b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0 ∧  p_614) -> (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧ -b^{1, 615}_0)
c  in CNF:
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_2
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_1
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_0
c  in DIMACS:
-3002  3003 -3004 -614 -3005 0
-3002  3003 -3004 -614 -3006 0
-3002  3003 -3004 -614 -3007 0

c  0+1 --> 1
c    (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧  p_614) -> (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0)
c  in CNF:
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_2
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_1
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨  b^{1, 615}_0
c  in DIMACS:
 3002  3003  3004 -614 -3005 0
 3002  3003  3004 -614 -3006 0
 3002  3003  3004 -614  3007 0

c  1+1 --> 2
c    (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0 ∧  p_614) -> (-b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0)
c  in CNF:
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_2
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨  b^{1, 615}_1
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ -p_614 ∨ -b^{1, 615}_0
c  in DIMACS:
 3002  3003 -3004 -614 -3005 0
 3002  3003 -3004 -614  3006 0
 3002  3003 -3004 -614 -3007 0

c  2+1 --> break 
c    (-b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧  p_614) -> break
c  in CNF:
c     b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ -p_614 ∨ break
c  in DIMACS:
 3002 -3003  3004 -614 1162 0


c  2-1 --> 1
c    (-b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧ -p_614) -> (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0)
c  in CNF:
c     b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_2
c     b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_1
c     b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨  b^{1, 615}_0
c  in DIMACS:
 3002 -3003  3004  614 -3005 0
 3002 -3003  3004  614 -3006 0
 3002 -3003  3004  614  3007 0

c  1-1 --> 0
c    (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0 ∧ -p_614) -> (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧ -b^{1, 615}_0)
c  in CNF:
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_2
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_1
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_0
c  in DIMACS:
 3002  3003 -3004  614 -3005 0
 3002  3003 -3004  614 -3006 0
 3002  3003 -3004  614 -3007 0

c  0-1 --> -1
c    (-b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧ -p_614) -> ( b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0)
c  in CNF:
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨  b^{1, 615}_2
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_1
c     b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨  b^{1, 615}_0
c  in DIMACS:
 3002  3003  3004  614  3005 0
 3002  3003  3004  614 -3006 0
 3002  3003  3004  614  3007 0

c  -1-1 --> -2
c    ( b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧  b^{1, 614}_0 ∧ -p_614) -> ( b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0)
c  in CNF:
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨  b^{1, 615}_2
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨  b^{1, 615}_1
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨  p_614 ∨ -b^{1, 615}_0
c  in DIMACS:
-3002  3003 -3004  614  3005 0
-3002  3003 -3004  614  3006 0
-3002  3003 -3004  614 -3007 0

c  -2-1 --> break 
c    ( b^{1, 614}_2 ∧  b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧ -p_614) -> break
c  in CNF:
c    -b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨  b^{1, 614}_0 ∨  p_614 ∨ break
c  in DIMACS:
-3002 -3003  3004  614 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 614}_2 ∧ -b^{1, 614}_1 ∧ -b^{1, 614}_0 ∧ true) 
c  in CNF:
c    -b^{1, 614}_2 ∨  b^{1, 614}_1 ∨  b^{1, 614}_0 ∨ false 
c  in DIMACS:
-3002  3003  3004  0

c  3 does not represent an automaton state.
c    -(-b^{1, 614}_2 ∧  b^{1, 614}_1 ∧  b^{1, 614}_0 ∧ true) 
c  in CNF:
c     b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ false 
c  in DIMACS:
 3002 -3003 -3004  0
c  -3 does not represent an automaton state.
c    -( b^{1, 614}_2 ∧  b^{1, 614}_1 ∧  b^{1, 614}_0 ∧ true) 
c  in CNF:
c    -b^{1, 614}_2 ∨ -b^{1, 614}_1 ∨ -b^{1, 614}_0 ∨ false 
c  in DIMACS:
-3002 -3003 -3004  0

c i = 615
c  -2+1 --> -1
c    ( b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧  p_615) -> ( b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0)
c  in CNF:
c    -b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨  b^{1, 616}_2
c    -b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_1
c    -b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨  b^{1, 616}_0
c  in DIMACS:
-3005 -3006  3007 -615  3008 0
-3005 -3006  3007 -615 -3009 0
-3005 -3006  3007 -615  3010 0

c  -1+1 --> 0
c    ( b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0 ∧  p_615) -> (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧ -b^{1, 616}_0)
c  in CNF:
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_2
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_1
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_0
c  in DIMACS:
-3005  3006 -3007 -615 -3008 0
-3005  3006 -3007 -615 -3009 0
-3005  3006 -3007 -615 -3010 0

c  0+1 --> 1
c    (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧  p_615) -> (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0)
c  in CNF:
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_2
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_1
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨  b^{1, 616}_0
c  in DIMACS:
 3005  3006  3007 -615 -3008 0
 3005  3006  3007 -615 -3009 0
 3005  3006  3007 -615  3010 0

c  1+1 --> 2
c    (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0 ∧  p_615) -> (-b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0)
c  in CNF:
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_2
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨  b^{1, 616}_1
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ -p_615 ∨ -b^{1, 616}_0
c  in DIMACS:
 3005  3006 -3007 -615 -3008 0
 3005  3006 -3007 -615  3009 0
 3005  3006 -3007 -615 -3010 0

c  2+1 --> break 
c    (-b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧  p_615) -> break
c  in CNF:
c     b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 3005 -3006  3007 -615 1162 0


c  2-1 --> 1
c    (-b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧ -p_615) -> (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0)
c  in CNF:
c     b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_2
c     b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_1
c     b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨  b^{1, 616}_0
c  in DIMACS:
 3005 -3006  3007  615 -3008 0
 3005 -3006  3007  615 -3009 0
 3005 -3006  3007  615  3010 0

c  1-1 --> 0
c    (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0 ∧ -p_615) -> (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧ -b^{1, 616}_0)
c  in CNF:
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_2
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_1
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_0
c  in DIMACS:
 3005  3006 -3007  615 -3008 0
 3005  3006 -3007  615 -3009 0
 3005  3006 -3007  615 -3010 0

c  0-1 --> -1
c    (-b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧ -p_615) -> ( b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0)
c  in CNF:
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨  b^{1, 616}_2
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_1
c     b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨  b^{1, 616}_0
c  in DIMACS:
 3005  3006  3007  615  3008 0
 3005  3006  3007  615 -3009 0
 3005  3006  3007  615  3010 0

c  -1-1 --> -2
c    ( b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧  b^{1, 615}_0 ∧ -p_615) -> ( b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0)
c  in CNF:
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨  b^{1, 616}_2
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨  b^{1, 616}_1
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨  p_615 ∨ -b^{1, 616}_0
c  in DIMACS:
-3005  3006 -3007  615  3008 0
-3005  3006 -3007  615  3009 0
-3005  3006 -3007  615 -3010 0

c  -2-1 --> break 
c    ( b^{1, 615}_2 ∧  b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨  b^{1, 615}_0 ∨  p_615 ∨ break
c  in DIMACS:
-3005 -3006  3007  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 615}_2 ∧ -b^{1, 615}_1 ∧ -b^{1, 615}_0 ∧ true) 
c  in CNF:
c    -b^{1, 615}_2 ∨  b^{1, 615}_1 ∨  b^{1, 615}_0 ∨ false 
c  in DIMACS:
-3005  3006  3007  0

c  3 does not represent an automaton state.
c    -(-b^{1, 615}_2 ∧  b^{1, 615}_1 ∧  b^{1, 615}_0 ∧ true) 
c  in CNF:
c     b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ false 
c  in DIMACS:
 3005 -3006 -3007  0
c  -3 does not represent an automaton state.
c    -( b^{1, 615}_2 ∧  b^{1, 615}_1 ∧  b^{1, 615}_0 ∧ true) 
c  in CNF:
c    -b^{1, 615}_2 ∨ -b^{1, 615}_1 ∨ -b^{1, 615}_0 ∨ false 
c  in DIMACS:
-3005 -3006 -3007  0

c i = 616
c  -2+1 --> -1
c    ( b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧  p_616) -> ( b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0)
c  in CNF:
c    -b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨  b^{1, 617}_2
c    -b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_1
c    -b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨  b^{1, 617}_0
c  in DIMACS:
-3008 -3009  3010 -616  3011 0
-3008 -3009  3010 -616 -3012 0
-3008 -3009  3010 -616  3013 0

c  -1+1 --> 0
c    ( b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0 ∧  p_616) -> (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧ -b^{1, 617}_0)
c  in CNF:
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_2
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_1
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_0
c  in DIMACS:
-3008  3009 -3010 -616 -3011 0
-3008  3009 -3010 -616 -3012 0
-3008  3009 -3010 -616 -3013 0

c  0+1 --> 1
c    (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧  p_616) -> (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0)
c  in CNF:
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_2
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_1
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨  b^{1, 617}_0
c  in DIMACS:
 3008  3009  3010 -616 -3011 0
 3008  3009  3010 -616 -3012 0
 3008  3009  3010 -616  3013 0

c  1+1 --> 2
c    (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0 ∧  p_616) -> (-b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0)
c  in CNF:
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_2
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨  b^{1, 617}_1
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ -p_616 ∨ -b^{1, 617}_0
c  in DIMACS:
 3008  3009 -3010 -616 -3011 0
 3008  3009 -3010 -616  3012 0
 3008  3009 -3010 -616 -3013 0

c  2+1 --> break 
c    (-b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧  p_616) -> break
c  in CNF:
c     b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 3008 -3009  3010 -616 1162 0


c  2-1 --> 1
c    (-b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧ -p_616) -> (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0)
c  in CNF:
c     b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_2
c     b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_1
c     b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨  b^{1, 617}_0
c  in DIMACS:
 3008 -3009  3010  616 -3011 0
 3008 -3009  3010  616 -3012 0
 3008 -3009  3010  616  3013 0

c  1-1 --> 0
c    (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0 ∧ -p_616) -> (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧ -b^{1, 617}_0)
c  in CNF:
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_2
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_1
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_0
c  in DIMACS:
 3008  3009 -3010  616 -3011 0
 3008  3009 -3010  616 -3012 0
 3008  3009 -3010  616 -3013 0

c  0-1 --> -1
c    (-b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧ -p_616) -> ( b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0)
c  in CNF:
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨  b^{1, 617}_2
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_1
c     b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨  b^{1, 617}_0
c  in DIMACS:
 3008  3009  3010  616  3011 0
 3008  3009  3010  616 -3012 0
 3008  3009  3010  616  3013 0

c  -1-1 --> -2
c    ( b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧  b^{1, 616}_0 ∧ -p_616) -> ( b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0)
c  in CNF:
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨  b^{1, 617}_2
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨  b^{1, 617}_1
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨  p_616 ∨ -b^{1, 617}_0
c  in DIMACS:
-3008  3009 -3010  616  3011 0
-3008  3009 -3010  616  3012 0
-3008  3009 -3010  616 -3013 0

c  -2-1 --> break 
c    ( b^{1, 616}_2 ∧  b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨  b^{1, 616}_0 ∨  p_616 ∨ break
c  in DIMACS:
-3008 -3009  3010  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 616}_2 ∧ -b^{1, 616}_1 ∧ -b^{1, 616}_0 ∧ true) 
c  in CNF:
c    -b^{1, 616}_2 ∨  b^{1, 616}_1 ∨  b^{1, 616}_0 ∨ false 
c  in DIMACS:
-3008  3009  3010  0

c  3 does not represent an automaton state.
c    -(-b^{1, 616}_2 ∧  b^{1, 616}_1 ∧  b^{1, 616}_0 ∧ true) 
c  in CNF:
c     b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ false 
c  in DIMACS:
 3008 -3009 -3010  0
c  -3 does not represent an automaton state.
c    -( b^{1, 616}_2 ∧  b^{1, 616}_1 ∧  b^{1, 616}_0 ∧ true) 
c  in CNF:
c    -b^{1, 616}_2 ∨ -b^{1, 616}_1 ∨ -b^{1, 616}_0 ∨ false 
c  in DIMACS:
-3008 -3009 -3010  0

c i = 617
c  -2+1 --> -1
c    ( b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧  p_617) -> ( b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0)
c  in CNF:
c    -b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨  b^{1, 618}_2
c    -b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_1
c    -b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨  b^{1, 618}_0
c  in DIMACS:
-3011 -3012  3013 -617  3014 0
-3011 -3012  3013 -617 -3015 0
-3011 -3012  3013 -617  3016 0

c  -1+1 --> 0
c    ( b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0 ∧  p_617) -> (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧ -b^{1, 618}_0)
c  in CNF:
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_2
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_1
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_0
c  in DIMACS:
-3011  3012 -3013 -617 -3014 0
-3011  3012 -3013 -617 -3015 0
-3011  3012 -3013 -617 -3016 0

c  0+1 --> 1
c    (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧  p_617) -> (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0)
c  in CNF:
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_2
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_1
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨  b^{1, 618}_0
c  in DIMACS:
 3011  3012  3013 -617 -3014 0
 3011  3012  3013 -617 -3015 0
 3011  3012  3013 -617  3016 0

c  1+1 --> 2
c    (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0 ∧  p_617) -> (-b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0)
c  in CNF:
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_2
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨  b^{1, 618}_1
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ -p_617 ∨ -b^{1, 618}_0
c  in DIMACS:
 3011  3012 -3013 -617 -3014 0
 3011  3012 -3013 -617  3015 0
 3011  3012 -3013 -617 -3016 0

c  2+1 --> break 
c    (-b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧  p_617) -> break
c  in CNF:
c     b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ -p_617 ∨ break
c  in DIMACS:
 3011 -3012  3013 -617 1162 0


c  2-1 --> 1
c    (-b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧ -p_617) -> (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0)
c  in CNF:
c     b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_2
c     b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_1
c     b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨  b^{1, 618}_0
c  in DIMACS:
 3011 -3012  3013  617 -3014 0
 3011 -3012  3013  617 -3015 0
 3011 -3012  3013  617  3016 0

c  1-1 --> 0
c    (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0 ∧ -p_617) -> (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧ -b^{1, 618}_0)
c  in CNF:
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_2
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_1
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_0
c  in DIMACS:
 3011  3012 -3013  617 -3014 0
 3011  3012 -3013  617 -3015 0
 3011  3012 -3013  617 -3016 0

c  0-1 --> -1
c    (-b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧ -p_617) -> ( b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0)
c  in CNF:
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨  b^{1, 618}_2
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_1
c     b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨  b^{1, 618}_0
c  in DIMACS:
 3011  3012  3013  617  3014 0
 3011  3012  3013  617 -3015 0
 3011  3012  3013  617  3016 0

c  -1-1 --> -2
c    ( b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧  b^{1, 617}_0 ∧ -p_617) -> ( b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0)
c  in CNF:
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨  b^{1, 618}_2
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨  b^{1, 618}_1
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨  p_617 ∨ -b^{1, 618}_0
c  in DIMACS:
-3011  3012 -3013  617  3014 0
-3011  3012 -3013  617  3015 0
-3011  3012 -3013  617 -3016 0

c  -2-1 --> break 
c    ( b^{1, 617}_2 ∧  b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧ -p_617) -> break
c  in CNF:
c    -b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨  b^{1, 617}_0 ∨  p_617 ∨ break
c  in DIMACS:
-3011 -3012  3013  617 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 617}_2 ∧ -b^{1, 617}_1 ∧ -b^{1, 617}_0 ∧ true) 
c  in CNF:
c    -b^{1, 617}_2 ∨  b^{1, 617}_1 ∨  b^{1, 617}_0 ∨ false 
c  in DIMACS:
-3011  3012  3013  0

c  3 does not represent an automaton state.
c    -(-b^{1, 617}_2 ∧  b^{1, 617}_1 ∧  b^{1, 617}_0 ∧ true) 
c  in CNF:
c     b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ false 
c  in DIMACS:
 3011 -3012 -3013  0
c  -3 does not represent an automaton state.
c    -( b^{1, 617}_2 ∧  b^{1, 617}_1 ∧  b^{1, 617}_0 ∧ true) 
c  in CNF:
c    -b^{1, 617}_2 ∨ -b^{1, 617}_1 ∨ -b^{1, 617}_0 ∨ false 
c  in DIMACS:
-3011 -3012 -3013  0

c i = 618
c  -2+1 --> -1
c    ( b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧  p_618) -> ( b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0)
c  in CNF:
c    -b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨  b^{1, 619}_2
c    -b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_1
c    -b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨  b^{1, 619}_0
c  in DIMACS:
-3014 -3015  3016 -618  3017 0
-3014 -3015  3016 -618 -3018 0
-3014 -3015  3016 -618  3019 0

c  -1+1 --> 0
c    ( b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0 ∧  p_618) -> (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧ -b^{1, 619}_0)
c  in CNF:
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_2
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_1
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_0
c  in DIMACS:
-3014  3015 -3016 -618 -3017 0
-3014  3015 -3016 -618 -3018 0
-3014  3015 -3016 -618 -3019 0

c  0+1 --> 1
c    (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧  p_618) -> (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0)
c  in CNF:
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_2
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_1
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨  b^{1, 619}_0
c  in DIMACS:
 3014  3015  3016 -618 -3017 0
 3014  3015  3016 -618 -3018 0
 3014  3015  3016 -618  3019 0

c  1+1 --> 2
c    (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0 ∧  p_618) -> (-b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0)
c  in CNF:
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_2
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨  b^{1, 619}_1
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ -p_618 ∨ -b^{1, 619}_0
c  in DIMACS:
 3014  3015 -3016 -618 -3017 0
 3014  3015 -3016 -618  3018 0
 3014  3015 -3016 -618 -3019 0

c  2+1 --> break 
c    (-b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧  p_618) -> break
c  in CNF:
c     b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 3014 -3015  3016 -618 1162 0


c  2-1 --> 1
c    (-b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧ -p_618) -> (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0)
c  in CNF:
c     b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_2
c     b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_1
c     b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨  b^{1, 619}_0
c  in DIMACS:
 3014 -3015  3016  618 -3017 0
 3014 -3015  3016  618 -3018 0
 3014 -3015  3016  618  3019 0

c  1-1 --> 0
c    (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0 ∧ -p_618) -> (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧ -b^{1, 619}_0)
c  in CNF:
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_2
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_1
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_0
c  in DIMACS:
 3014  3015 -3016  618 -3017 0
 3014  3015 -3016  618 -3018 0
 3014  3015 -3016  618 -3019 0

c  0-1 --> -1
c    (-b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧ -p_618) -> ( b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0)
c  in CNF:
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨  b^{1, 619}_2
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_1
c     b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨  b^{1, 619}_0
c  in DIMACS:
 3014  3015  3016  618  3017 0
 3014  3015  3016  618 -3018 0
 3014  3015  3016  618  3019 0

c  -1-1 --> -2
c    ( b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧  b^{1, 618}_0 ∧ -p_618) -> ( b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0)
c  in CNF:
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨  b^{1, 619}_2
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨  b^{1, 619}_1
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨  p_618 ∨ -b^{1, 619}_0
c  in DIMACS:
-3014  3015 -3016  618  3017 0
-3014  3015 -3016  618  3018 0
-3014  3015 -3016  618 -3019 0

c  -2-1 --> break 
c    ( b^{1, 618}_2 ∧  b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨  b^{1, 618}_0 ∨  p_618 ∨ break
c  in DIMACS:
-3014 -3015  3016  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 618}_2 ∧ -b^{1, 618}_1 ∧ -b^{1, 618}_0 ∧ true) 
c  in CNF:
c    -b^{1, 618}_2 ∨  b^{1, 618}_1 ∨  b^{1, 618}_0 ∨ false 
c  in DIMACS:
-3014  3015  3016  0

c  3 does not represent an automaton state.
c    -(-b^{1, 618}_2 ∧  b^{1, 618}_1 ∧  b^{1, 618}_0 ∧ true) 
c  in CNF:
c     b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ false 
c  in DIMACS:
 3014 -3015 -3016  0
c  -3 does not represent an automaton state.
c    -( b^{1, 618}_2 ∧  b^{1, 618}_1 ∧  b^{1, 618}_0 ∧ true) 
c  in CNF:
c    -b^{1, 618}_2 ∨ -b^{1, 618}_1 ∨ -b^{1, 618}_0 ∨ false 
c  in DIMACS:
-3014 -3015 -3016  0

c i = 619
c  -2+1 --> -1
c    ( b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧  p_619) -> ( b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0)
c  in CNF:
c    -b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨  b^{1, 620}_2
c    -b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_1
c    -b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨  b^{1, 620}_0
c  in DIMACS:
-3017 -3018  3019 -619  3020 0
-3017 -3018  3019 -619 -3021 0
-3017 -3018  3019 -619  3022 0

c  -1+1 --> 0
c    ( b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0 ∧  p_619) -> (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧ -b^{1, 620}_0)
c  in CNF:
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_2
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_1
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_0
c  in DIMACS:
-3017  3018 -3019 -619 -3020 0
-3017  3018 -3019 -619 -3021 0
-3017  3018 -3019 -619 -3022 0

c  0+1 --> 1
c    (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧  p_619) -> (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0)
c  in CNF:
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_2
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_1
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨  b^{1, 620}_0
c  in DIMACS:
 3017  3018  3019 -619 -3020 0
 3017  3018  3019 -619 -3021 0
 3017  3018  3019 -619  3022 0

c  1+1 --> 2
c    (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0 ∧  p_619) -> (-b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0)
c  in CNF:
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_2
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨  b^{1, 620}_1
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ -p_619 ∨ -b^{1, 620}_0
c  in DIMACS:
 3017  3018 -3019 -619 -3020 0
 3017  3018 -3019 -619  3021 0
 3017  3018 -3019 -619 -3022 0

c  2+1 --> break 
c    (-b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧  p_619) -> break
c  in CNF:
c     b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ -p_619 ∨ break
c  in DIMACS:
 3017 -3018  3019 -619 1162 0


c  2-1 --> 1
c    (-b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧ -p_619) -> (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0)
c  in CNF:
c     b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_2
c     b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_1
c     b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨  b^{1, 620}_0
c  in DIMACS:
 3017 -3018  3019  619 -3020 0
 3017 -3018  3019  619 -3021 0
 3017 -3018  3019  619  3022 0

c  1-1 --> 0
c    (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0 ∧ -p_619) -> (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧ -b^{1, 620}_0)
c  in CNF:
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_2
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_1
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_0
c  in DIMACS:
 3017  3018 -3019  619 -3020 0
 3017  3018 -3019  619 -3021 0
 3017  3018 -3019  619 -3022 0

c  0-1 --> -1
c    (-b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧ -p_619) -> ( b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0)
c  in CNF:
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨  b^{1, 620}_2
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_1
c     b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨  b^{1, 620}_0
c  in DIMACS:
 3017  3018  3019  619  3020 0
 3017  3018  3019  619 -3021 0
 3017  3018  3019  619  3022 0

c  -1-1 --> -2
c    ( b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧  b^{1, 619}_0 ∧ -p_619) -> ( b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0)
c  in CNF:
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨  b^{1, 620}_2
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨  b^{1, 620}_1
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨  p_619 ∨ -b^{1, 620}_0
c  in DIMACS:
-3017  3018 -3019  619  3020 0
-3017  3018 -3019  619  3021 0
-3017  3018 -3019  619 -3022 0

c  -2-1 --> break 
c    ( b^{1, 619}_2 ∧  b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧ -p_619) -> break
c  in CNF:
c    -b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨  b^{1, 619}_0 ∨  p_619 ∨ break
c  in DIMACS:
-3017 -3018  3019  619 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 619}_2 ∧ -b^{1, 619}_1 ∧ -b^{1, 619}_0 ∧ true) 
c  in CNF:
c    -b^{1, 619}_2 ∨  b^{1, 619}_1 ∨  b^{1, 619}_0 ∨ false 
c  in DIMACS:
-3017  3018  3019  0

c  3 does not represent an automaton state.
c    -(-b^{1, 619}_2 ∧  b^{1, 619}_1 ∧  b^{1, 619}_0 ∧ true) 
c  in CNF:
c     b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ false 
c  in DIMACS:
 3017 -3018 -3019  0
c  -3 does not represent an automaton state.
c    -( b^{1, 619}_2 ∧  b^{1, 619}_1 ∧  b^{1, 619}_0 ∧ true) 
c  in CNF:
c    -b^{1, 619}_2 ∨ -b^{1, 619}_1 ∨ -b^{1, 619}_0 ∨ false 
c  in DIMACS:
-3017 -3018 -3019  0

c i = 620
c  -2+1 --> -1
c    ( b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧  p_620) -> ( b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0)
c  in CNF:
c    -b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨  b^{1, 621}_2
c    -b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_1
c    -b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨  b^{1, 621}_0
c  in DIMACS:
-3020 -3021  3022 -620  3023 0
-3020 -3021  3022 -620 -3024 0
-3020 -3021  3022 -620  3025 0

c  -1+1 --> 0
c    ( b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0 ∧  p_620) -> (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧ -b^{1, 621}_0)
c  in CNF:
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_2
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_1
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_0
c  in DIMACS:
-3020  3021 -3022 -620 -3023 0
-3020  3021 -3022 -620 -3024 0
-3020  3021 -3022 -620 -3025 0

c  0+1 --> 1
c    (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧  p_620) -> (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0)
c  in CNF:
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_2
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_1
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨  b^{1, 621}_0
c  in DIMACS:
 3020  3021  3022 -620 -3023 0
 3020  3021  3022 -620 -3024 0
 3020  3021  3022 -620  3025 0

c  1+1 --> 2
c    (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0 ∧  p_620) -> (-b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0)
c  in CNF:
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_2
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨  b^{1, 621}_1
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ -p_620 ∨ -b^{1, 621}_0
c  in DIMACS:
 3020  3021 -3022 -620 -3023 0
 3020  3021 -3022 -620  3024 0
 3020  3021 -3022 -620 -3025 0

c  2+1 --> break 
c    (-b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧  p_620) -> break
c  in CNF:
c     b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 3020 -3021  3022 -620 1162 0


c  2-1 --> 1
c    (-b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧ -p_620) -> (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0)
c  in CNF:
c     b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_2
c     b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_1
c     b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨  b^{1, 621}_0
c  in DIMACS:
 3020 -3021  3022  620 -3023 0
 3020 -3021  3022  620 -3024 0
 3020 -3021  3022  620  3025 0

c  1-1 --> 0
c    (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0 ∧ -p_620) -> (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧ -b^{1, 621}_0)
c  in CNF:
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_2
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_1
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_0
c  in DIMACS:
 3020  3021 -3022  620 -3023 0
 3020  3021 -3022  620 -3024 0
 3020  3021 -3022  620 -3025 0

c  0-1 --> -1
c    (-b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧ -p_620) -> ( b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0)
c  in CNF:
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨  b^{1, 621}_2
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_1
c     b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨  b^{1, 621}_0
c  in DIMACS:
 3020  3021  3022  620  3023 0
 3020  3021  3022  620 -3024 0
 3020  3021  3022  620  3025 0

c  -1-1 --> -2
c    ( b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧  b^{1, 620}_0 ∧ -p_620) -> ( b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0)
c  in CNF:
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨  b^{1, 621}_2
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨  b^{1, 621}_1
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨  p_620 ∨ -b^{1, 621}_0
c  in DIMACS:
-3020  3021 -3022  620  3023 0
-3020  3021 -3022  620  3024 0
-3020  3021 -3022  620 -3025 0

c  -2-1 --> break 
c    ( b^{1, 620}_2 ∧  b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨  b^{1, 620}_0 ∨  p_620 ∨ break
c  in DIMACS:
-3020 -3021  3022  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 620}_2 ∧ -b^{1, 620}_1 ∧ -b^{1, 620}_0 ∧ true) 
c  in CNF:
c    -b^{1, 620}_2 ∨  b^{1, 620}_1 ∨  b^{1, 620}_0 ∨ false 
c  in DIMACS:
-3020  3021  3022  0

c  3 does not represent an automaton state.
c    -(-b^{1, 620}_2 ∧  b^{1, 620}_1 ∧  b^{1, 620}_0 ∧ true) 
c  in CNF:
c     b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ false 
c  in DIMACS:
 3020 -3021 -3022  0
c  -3 does not represent an automaton state.
c    -( b^{1, 620}_2 ∧  b^{1, 620}_1 ∧  b^{1, 620}_0 ∧ true) 
c  in CNF:
c    -b^{1, 620}_2 ∨ -b^{1, 620}_1 ∨ -b^{1, 620}_0 ∨ false 
c  in DIMACS:
-3020 -3021 -3022  0

c i = 621
c  -2+1 --> -1
c    ( b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧  p_621) -> ( b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0)
c  in CNF:
c    -b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨  b^{1, 622}_2
c    -b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_1
c    -b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨  b^{1, 622}_0
c  in DIMACS:
-3023 -3024  3025 -621  3026 0
-3023 -3024  3025 -621 -3027 0
-3023 -3024  3025 -621  3028 0

c  -1+1 --> 0
c    ( b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0 ∧  p_621) -> (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧ -b^{1, 622}_0)
c  in CNF:
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_2
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_1
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_0
c  in DIMACS:
-3023  3024 -3025 -621 -3026 0
-3023  3024 -3025 -621 -3027 0
-3023  3024 -3025 -621 -3028 0

c  0+1 --> 1
c    (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧  p_621) -> (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0)
c  in CNF:
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_2
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_1
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨  b^{1, 622}_0
c  in DIMACS:
 3023  3024  3025 -621 -3026 0
 3023  3024  3025 -621 -3027 0
 3023  3024  3025 -621  3028 0

c  1+1 --> 2
c    (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0 ∧  p_621) -> (-b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0)
c  in CNF:
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_2
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨  b^{1, 622}_1
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ -p_621 ∨ -b^{1, 622}_0
c  in DIMACS:
 3023  3024 -3025 -621 -3026 0
 3023  3024 -3025 -621  3027 0
 3023  3024 -3025 -621 -3028 0

c  2+1 --> break 
c    (-b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧  p_621) -> break
c  in CNF:
c     b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 3023 -3024  3025 -621 1162 0


c  2-1 --> 1
c    (-b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧ -p_621) -> (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0)
c  in CNF:
c     b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_2
c     b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_1
c     b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨  b^{1, 622}_0
c  in DIMACS:
 3023 -3024  3025  621 -3026 0
 3023 -3024  3025  621 -3027 0
 3023 -3024  3025  621  3028 0

c  1-1 --> 0
c    (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0 ∧ -p_621) -> (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧ -b^{1, 622}_0)
c  in CNF:
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_2
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_1
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_0
c  in DIMACS:
 3023  3024 -3025  621 -3026 0
 3023  3024 -3025  621 -3027 0
 3023  3024 -3025  621 -3028 0

c  0-1 --> -1
c    (-b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧ -p_621) -> ( b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0)
c  in CNF:
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨  b^{1, 622}_2
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_1
c     b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨  b^{1, 622}_0
c  in DIMACS:
 3023  3024  3025  621  3026 0
 3023  3024  3025  621 -3027 0
 3023  3024  3025  621  3028 0

c  -1-1 --> -2
c    ( b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧  b^{1, 621}_0 ∧ -p_621) -> ( b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0)
c  in CNF:
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨  b^{1, 622}_2
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨  b^{1, 622}_1
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨  p_621 ∨ -b^{1, 622}_0
c  in DIMACS:
-3023  3024 -3025  621  3026 0
-3023  3024 -3025  621  3027 0
-3023  3024 -3025  621 -3028 0

c  -2-1 --> break 
c    ( b^{1, 621}_2 ∧  b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨  b^{1, 621}_0 ∨  p_621 ∨ break
c  in DIMACS:
-3023 -3024  3025  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 621}_2 ∧ -b^{1, 621}_1 ∧ -b^{1, 621}_0 ∧ true) 
c  in CNF:
c    -b^{1, 621}_2 ∨  b^{1, 621}_1 ∨  b^{1, 621}_0 ∨ false 
c  in DIMACS:
-3023  3024  3025  0

c  3 does not represent an automaton state.
c    -(-b^{1, 621}_2 ∧  b^{1, 621}_1 ∧  b^{1, 621}_0 ∧ true) 
c  in CNF:
c     b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ false 
c  in DIMACS:
 3023 -3024 -3025  0
c  -3 does not represent an automaton state.
c    -( b^{1, 621}_2 ∧  b^{1, 621}_1 ∧  b^{1, 621}_0 ∧ true) 
c  in CNF:
c    -b^{1, 621}_2 ∨ -b^{1, 621}_1 ∨ -b^{1, 621}_0 ∨ false 
c  in DIMACS:
-3023 -3024 -3025  0

c i = 622
c  -2+1 --> -1
c    ( b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧  p_622) -> ( b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0)
c  in CNF:
c    -b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨  b^{1, 623}_2
c    -b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_1
c    -b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨  b^{1, 623}_0
c  in DIMACS:
-3026 -3027  3028 -622  3029 0
-3026 -3027  3028 -622 -3030 0
-3026 -3027  3028 -622  3031 0

c  -1+1 --> 0
c    ( b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0 ∧  p_622) -> (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧ -b^{1, 623}_0)
c  in CNF:
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_2
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_1
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_0
c  in DIMACS:
-3026  3027 -3028 -622 -3029 0
-3026  3027 -3028 -622 -3030 0
-3026  3027 -3028 -622 -3031 0

c  0+1 --> 1
c    (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧  p_622) -> (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0)
c  in CNF:
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_2
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_1
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨  b^{1, 623}_0
c  in DIMACS:
 3026  3027  3028 -622 -3029 0
 3026  3027  3028 -622 -3030 0
 3026  3027  3028 -622  3031 0

c  1+1 --> 2
c    (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0 ∧  p_622) -> (-b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0)
c  in CNF:
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_2
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨  b^{1, 623}_1
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ -p_622 ∨ -b^{1, 623}_0
c  in DIMACS:
 3026  3027 -3028 -622 -3029 0
 3026  3027 -3028 -622  3030 0
 3026  3027 -3028 -622 -3031 0

c  2+1 --> break 
c    (-b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧  p_622) -> break
c  in CNF:
c     b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ -p_622 ∨ break
c  in DIMACS:
 3026 -3027  3028 -622 1162 0


c  2-1 --> 1
c    (-b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧ -p_622) -> (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0)
c  in CNF:
c     b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_2
c     b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_1
c     b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨  b^{1, 623}_0
c  in DIMACS:
 3026 -3027  3028  622 -3029 0
 3026 -3027  3028  622 -3030 0
 3026 -3027  3028  622  3031 0

c  1-1 --> 0
c    (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0 ∧ -p_622) -> (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧ -b^{1, 623}_0)
c  in CNF:
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_2
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_1
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_0
c  in DIMACS:
 3026  3027 -3028  622 -3029 0
 3026  3027 -3028  622 -3030 0
 3026  3027 -3028  622 -3031 0

c  0-1 --> -1
c    (-b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧ -p_622) -> ( b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0)
c  in CNF:
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨  b^{1, 623}_2
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_1
c     b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨  b^{1, 623}_0
c  in DIMACS:
 3026  3027  3028  622  3029 0
 3026  3027  3028  622 -3030 0
 3026  3027  3028  622  3031 0

c  -1-1 --> -2
c    ( b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧  b^{1, 622}_0 ∧ -p_622) -> ( b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0)
c  in CNF:
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨  b^{1, 623}_2
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨  b^{1, 623}_1
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨  p_622 ∨ -b^{1, 623}_0
c  in DIMACS:
-3026  3027 -3028  622  3029 0
-3026  3027 -3028  622  3030 0
-3026  3027 -3028  622 -3031 0

c  -2-1 --> break 
c    ( b^{1, 622}_2 ∧  b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧ -p_622) -> break
c  in CNF:
c    -b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨  b^{1, 622}_0 ∨  p_622 ∨ break
c  in DIMACS:
-3026 -3027  3028  622 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 622}_2 ∧ -b^{1, 622}_1 ∧ -b^{1, 622}_0 ∧ true) 
c  in CNF:
c    -b^{1, 622}_2 ∨  b^{1, 622}_1 ∨  b^{1, 622}_0 ∨ false 
c  in DIMACS:
-3026  3027  3028  0

c  3 does not represent an automaton state.
c    -(-b^{1, 622}_2 ∧  b^{1, 622}_1 ∧  b^{1, 622}_0 ∧ true) 
c  in CNF:
c     b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ false 
c  in DIMACS:
 3026 -3027 -3028  0
c  -3 does not represent an automaton state.
c    -( b^{1, 622}_2 ∧  b^{1, 622}_1 ∧  b^{1, 622}_0 ∧ true) 
c  in CNF:
c    -b^{1, 622}_2 ∨ -b^{1, 622}_1 ∨ -b^{1, 622}_0 ∨ false 
c  in DIMACS:
-3026 -3027 -3028  0

c i = 623
c  -2+1 --> -1
c    ( b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧  p_623) -> ( b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0)
c  in CNF:
c    -b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨  b^{1, 624}_2
c    -b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_1
c    -b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨  b^{1, 624}_0
c  in DIMACS:
-3029 -3030  3031 -623  3032 0
-3029 -3030  3031 -623 -3033 0
-3029 -3030  3031 -623  3034 0

c  -1+1 --> 0
c    ( b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0 ∧  p_623) -> (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧ -b^{1, 624}_0)
c  in CNF:
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_2
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_1
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_0
c  in DIMACS:
-3029  3030 -3031 -623 -3032 0
-3029  3030 -3031 -623 -3033 0
-3029  3030 -3031 -623 -3034 0

c  0+1 --> 1
c    (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧  p_623) -> (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0)
c  in CNF:
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_2
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_1
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨  b^{1, 624}_0
c  in DIMACS:
 3029  3030  3031 -623 -3032 0
 3029  3030  3031 -623 -3033 0
 3029  3030  3031 -623  3034 0

c  1+1 --> 2
c    (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0 ∧  p_623) -> (-b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0)
c  in CNF:
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_2
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨  b^{1, 624}_1
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ -p_623 ∨ -b^{1, 624}_0
c  in DIMACS:
 3029  3030 -3031 -623 -3032 0
 3029  3030 -3031 -623  3033 0
 3029  3030 -3031 -623 -3034 0

c  2+1 --> break 
c    (-b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧  p_623) -> break
c  in CNF:
c     b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ -p_623 ∨ break
c  in DIMACS:
 3029 -3030  3031 -623 1162 0


c  2-1 --> 1
c    (-b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧ -p_623) -> (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0)
c  in CNF:
c     b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_2
c     b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_1
c     b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨  b^{1, 624}_0
c  in DIMACS:
 3029 -3030  3031  623 -3032 0
 3029 -3030  3031  623 -3033 0
 3029 -3030  3031  623  3034 0

c  1-1 --> 0
c    (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0 ∧ -p_623) -> (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧ -b^{1, 624}_0)
c  in CNF:
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_2
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_1
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_0
c  in DIMACS:
 3029  3030 -3031  623 -3032 0
 3029  3030 -3031  623 -3033 0
 3029  3030 -3031  623 -3034 0

c  0-1 --> -1
c    (-b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧ -p_623) -> ( b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0)
c  in CNF:
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨  b^{1, 624}_2
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_1
c     b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨  b^{1, 624}_0
c  in DIMACS:
 3029  3030  3031  623  3032 0
 3029  3030  3031  623 -3033 0
 3029  3030  3031  623  3034 0

c  -1-1 --> -2
c    ( b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧  b^{1, 623}_0 ∧ -p_623) -> ( b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0)
c  in CNF:
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨  b^{1, 624}_2
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨  b^{1, 624}_1
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨  p_623 ∨ -b^{1, 624}_0
c  in DIMACS:
-3029  3030 -3031  623  3032 0
-3029  3030 -3031  623  3033 0
-3029  3030 -3031  623 -3034 0

c  -2-1 --> break 
c    ( b^{1, 623}_2 ∧  b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧ -p_623) -> break
c  in CNF:
c    -b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨  b^{1, 623}_0 ∨  p_623 ∨ break
c  in DIMACS:
-3029 -3030  3031  623 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 623}_2 ∧ -b^{1, 623}_1 ∧ -b^{1, 623}_0 ∧ true) 
c  in CNF:
c    -b^{1, 623}_2 ∨  b^{1, 623}_1 ∨  b^{1, 623}_0 ∨ false 
c  in DIMACS:
-3029  3030  3031  0

c  3 does not represent an automaton state.
c    -(-b^{1, 623}_2 ∧  b^{1, 623}_1 ∧  b^{1, 623}_0 ∧ true) 
c  in CNF:
c     b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ false 
c  in DIMACS:
 3029 -3030 -3031  0
c  -3 does not represent an automaton state.
c    -( b^{1, 623}_2 ∧  b^{1, 623}_1 ∧  b^{1, 623}_0 ∧ true) 
c  in CNF:
c    -b^{1, 623}_2 ∨ -b^{1, 623}_1 ∨ -b^{1, 623}_0 ∨ false 
c  in DIMACS:
-3029 -3030 -3031  0

c i = 624
c  -2+1 --> -1
c    ( b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧  p_624) -> ( b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0)
c  in CNF:
c    -b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨  b^{1, 625}_2
c    -b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_1
c    -b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨  b^{1, 625}_0
c  in DIMACS:
-3032 -3033  3034 -624  3035 0
-3032 -3033  3034 -624 -3036 0
-3032 -3033  3034 -624  3037 0

c  -1+1 --> 0
c    ( b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0 ∧  p_624) -> (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧ -b^{1, 625}_0)
c  in CNF:
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_2
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_1
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_0
c  in DIMACS:
-3032  3033 -3034 -624 -3035 0
-3032  3033 -3034 -624 -3036 0
-3032  3033 -3034 -624 -3037 0

c  0+1 --> 1
c    (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧  p_624) -> (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0)
c  in CNF:
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_2
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_1
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨  b^{1, 625}_0
c  in DIMACS:
 3032  3033  3034 -624 -3035 0
 3032  3033  3034 -624 -3036 0
 3032  3033  3034 -624  3037 0

c  1+1 --> 2
c    (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0 ∧  p_624) -> (-b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0)
c  in CNF:
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_2
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨  b^{1, 625}_1
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ -p_624 ∨ -b^{1, 625}_0
c  in DIMACS:
 3032  3033 -3034 -624 -3035 0
 3032  3033 -3034 -624  3036 0
 3032  3033 -3034 -624 -3037 0

c  2+1 --> break 
c    (-b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧  p_624) -> break
c  in CNF:
c     b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 3032 -3033  3034 -624 1162 0


c  2-1 --> 1
c    (-b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧ -p_624) -> (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0)
c  in CNF:
c     b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_2
c     b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_1
c     b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨  b^{1, 625}_0
c  in DIMACS:
 3032 -3033  3034  624 -3035 0
 3032 -3033  3034  624 -3036 0
 3032 -3033  3034  624  3037 0

c  1-1 --> 0
c    (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0 ∧ -p_624) -> (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧ -b^{1, 625}_0)
c  in CNF:
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_2
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_1
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_0
c  in DIMACS:
 3032  3033 -3034  624 -3035 0
 3032  3033 -3034  624 -3036 0
 3032  3033 -3034  624 -3037 0

c  0-1 --> -1
c    (-b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧ -p_624) -> ( b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0)
c  in CNF:
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨  b^{1, 625}_2
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_1
c     b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨  b^{1, 625}_0
c  in DIMACS:
 3032  3033  3034  624  3035 0
 3032  3033  3034  624 -3036 0
 3032  3033  3034  624  3037 0

c  -1-1 --> -2
c    ( b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧  b^{1, 624}_0 ∧ -p_624) -> ( b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0)
c  in CNF:
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨  b^{1, 625}_2
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨  b^{1, 625}_1
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨  p_624 ∨ -b^{1, 625}_0
c  in DIMACS:
-3032  3033 -3034  624  3035 0
-3032  3033 -3034  624  3036 0
-3032  3033 -3034  624 -3037 0

c  -2-1 --> break 
c    ( b^{1, 624}_2 ∧  b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨  b^{1, 624}_0 ∨  p_624 ∨ break
c  in DIMACS:
-3032 -3033  3034  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 624}_2 ∧ -b^{1, 624}_1 ∧ -b^{1, 624}_0 ∧ true) 
c  in CNF:
c    -b^{1, 624}_2 ∨  b^{1, 624}_1 ∨  b^{1, 624}_0 ∨ false 
c  in DIMACS:
-3032  3033  3034  0

c  3 does not represent an automaton state.
c    -(-b^{1, 624}_2 ∧  b^{1, 624}_1 ∧  b^{1, 624}_0 ∧ true) 
c  in CNF:
c     b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ false 
c  in DIMACS:
 3032 -3033 -3034  0
c  -3 does not represent an automaton state.
c    -( b^{1, 624}_2 ∧  b^{1, 624}_1 ∧  b^{1, 624}_0 ∧ true) 
c  in CNF:
c    -b^{1, 624}_2 ∨ -b^{1, 624}_1 ∨ -b^{1, 624}_0 ∨ false 
c  in DIMACS:
-3032 -3033 -3034  0

c i = 625
c  -2+1 --> -1
c    ( b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧  p_625) -> ( b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0)
c  in CNF:
c    -b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨  b^{1, 626}_2
c    -b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_1
c    -b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨  b^{1, 626}_0
c  in DIMACS:
-3035 -3036  3037 -625  3038 0
-3035 -3036  3037 -625 -3039 0
-3035 -3036  3037 -625  3040 0

c  -1+1 --> 0
c    ( b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0 ∧  p_625) -> (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧ -b^{1, 626}_0)
c  in CNF:
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_2
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_1
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_0
c  in DIMACS:
-3035  3036 -3037 -625 -3038 0
-3035  3036 -3037 -625 -3039 0
-3035  3036 -3037 -625 -3040 0

c  0+1 --> 1
c    (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧  p_625) -> (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0)
c  in CNF:
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_2
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_1
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨  b^{1, 626}_0
c  in DIMACS:
 3035  3036  3037 -625 -3038 0
 3035  3036  3037 -625 -3039 0
 3035  3036  3037 -625  3040 0

c  1+1 --> 2
c    (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0 ∧  p_625) -> (-b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0)
c  in CNF:
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_2
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨  b^{1, 626}_1
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ -p_625 ∨ -b^{1, 626}_0
c  in DIMACS:
 3035  3036 -3037 -625 -3038 0
 3035  3036 -3037 -625  3039 0
 3035  3036 -3037 -625 -3040 0

c  2+1 --> break 
c    (-b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧  p_625) -> break
c  in CNF:
c     b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ -p_625 ∨ break
c  in DIMACS:
 3035 -3036  3037 -625 1162 0


c  2-1 --> 1
c    (-b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧ -p_625) -> (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0)
c  in CNF:
c     b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_2
c     b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_1
c     b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨  b^{1, 626}_0
c  in DIMACS:
 3035 -3036  3037  625 -3038 0
 3035 -3036  3037  625 -3039 0
 3035 -3036  3037  625  3040 0

c  1-1 --> 0
c    (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0 ∧ -p_625) -> (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧ -b^{1, 626}_0)
c  in CNF:
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_2
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_1
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_0
c  in DIMACS:
 3035  3036 -3037  625 -3038 0
 3035  3036 -3037  625 -3039 0
 3035  3036 -3037  625 -3040 0

c  0-1 --> -1
c    (-b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧ -p_625) -> ( b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0)
c  in CNF:
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨  b^{1, 626}_2
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_1
c     b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨  b^{1, 626}_0
c  in DIMACS:
 3035  3036  3037  625  3038 0
 3035  3036  3037  625 -3039 0
 3035  3036  3037  625  3040 0

c  -1-1 --> -2
c    ( b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧  b^{1, 625}_0 ∧ -p_625) -> ( b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0)
c  in CNF:
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨  b^{1, 626}_2
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨  b^{1, 626}_1
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨  p_625 ∨ -b^{1, 626}_0
c  in DIMACS:
-3035  3036 -3037  625  3038 0
-3035  3036 -3037  625  3039 0
-3035  3036 -3037  625 -3040 0

c  -2-1 --> break 
c    ( b^{1, 625}_2 ∧  b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧ -p_625) -> break
c  in CNF:
c    -b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨  b^{1, 625}_0 ∨  p_625 ∨ break
c  in DIMACS:
-3035 -3036  3037  625 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 625}_2 ∧ -b^{1, 625}_1 ∧ -b^{1, 625}_0 ∧ true) 
c  in CNF:
c    -b^{1, 625}_2 ∨  b^{1, 625}_1 ∨  b^{1, 625}_0 ∨ false 
c  in DIMACS:
-3035  3036  3037  0

c  3 does not represent an automaton state.
c    -(-b^{1, 625}_2 ∧  b^{1, 625}_1 ∧  b^{1, 625}_0 ∧ true) 
c  in CNF:
c     b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ false 
c  in DIMACS:
 3035 -3036 -3037  0
c  -3 does not represent an automaton state.
c    -( b^{1, 625}_2 ∧  b^{1, 625}_1 ∧  b^{1, 625}_0 ∧ true) 
c  in CNF:
c    -b^{1, 625}_2 ∨ -b^{1, 625}_1 ∨ -b^{1, 625}_0 ∨ false 
c  in DIMACS:
-3035 -3036 -3037  0

c i = 626
c  -2+1 --> -1
c    ( b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧  p_626) -> ( b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0)
c  in CNF:
c    -b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨  b^{1, 627}_2
c    -b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_1
c    -b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨  b^{1, 627}_0
c  in DIMACS:
-3038 -3039  3040 -626  3041 0
-3038 -3039  3040 -626 -3042 0
-3038 -3039  3040 -626  3043 0

c  -1+1 --> 0
c    ( b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0 ∧  p_626) -> (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧ -b^{1, 627}_0)
c  in CNF:
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_2
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_1
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_0
c  in DIMACS:
-3038  3039 -3040 -626 -3041 0
-3038  3039 -3040 -626 -3042 0
-3038  3039 -3040 -626 -3043 0

c  0+1 --> 1
c    (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧  p_626) -> (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0)
c  in CNF:
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_2
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_1
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨  b^{1, 627}_0
c  in DIMACS:
 3038  3039  3040 -626 -3041 0
 3038  3039  3040 -626 -3042 0
 3038  3039  3040 -626  3043 0

c  1+1 --> 2
c    (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0 ∧  p_626) -> (-b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0)
c  in CNF:
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_2
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨  b^{1, 627}_1
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ -p_626 ∨ -b^{1, 627}_0
c  in DIMACS:
 3038  3039 -3040 -626 -3041 0
 3038  3039 -3040 -626  3042 0
 3038  3039 -3040 -626 -3043 0

c  2+1 --> break 
c    (-b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧  p_626) -> break
c  in CNF:
c     b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ -p_626 ∨ break
c  in DIMACS:
 3038 -3039  3040 -626 1162 0


c  2-1 --> 1
c    (-b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧ -p_626) -> (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0)
c  in CNF:
c     b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_2
c     b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_1
c     b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨  b^{1, 627}_0
c  in DIMACS:
 3038 -3039  3040  626 -3041 0
 3038 -3039  3040  626 -3042 0
 3038 -3039  3040  626  3043 0

c  1-1 --> 0
c    (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0 ∧ -p_626) -> (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧ -b^{1, 627}_0)
c  in CNF:
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_2
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_1
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_0
c  in DIMACS:
 3038  3039 -3040  626 -3041 0
 3038  3039 -3040  626 -3042 0
 3038  3039 -3040  626 -3043 0

c  0-1 --> -1
c    (-b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧ -p_626) -> ( b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0)
c  in CNF:
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨  b^{1, 627}_2
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_1
c     b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨  b^{1, 627}_0
c  in DIMACS:
 3038  3039  3040  626  3041 0
 3038  3039  3040  626 -3042 0
 3038  3039  3040  626  3043 0

c  -1-1 --> -2
c    ( b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧  b^{1, 626}_0 ∧ -p_626) -> ( b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0)
c  in CNF:
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨  b^{1, 627}_2
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨  b^{1, 627}_1
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨  p_626 ∨ -b^{1, 627}_0
c  in DIMACS:
-3038  3039 -3040  626  3041 0
-3038  3039 -3040  626  3042 0
-3038  3039 -3040  626 -3043 0

c  -2-1 --> break 
c    ( b^{1, 626}_2 ∧  b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧ -p_626) -> break
c  in CNF:
c    -b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨  b^{1, 626}_0 ∨  p_626 ∨ break
c  in DIMACS:
-3038 -3039  3040  626 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 626}_2 ∧ -b^{1, 626}_1 ∧ -b^{1, 626}_0 ∧ true) 
c  in CNF:
c    -b^{1, 626}_2 ∨  b^{1, 626}_1 ∨  b^{1, 626}_0 ∨ false 
c  in DIMACS:
-3038  3039  3040  0

c  3 does not represent an automaton state.
c    -(-b^{1, 626}_2 ∧  b^{1, 626}_1 ∧  b^{1, 626}_0 ∧ true) 
c  in CNF:
c     b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ false 
c  in DIMACS:
 3038 -3039 -3040  0
c  -3 does not represent an automaton state.
c    -( b^{1, 626}_2 ∧  b^{1, 626}_1 ∧  b^{1, 626}_0 ∧ true) 
c  in CNF:
c    -b^{1, 626}_2 ∨ -b^{1, 626}_1 ∨ -b^{1, 626}_0 ∨ false 
c  in DIMACS:
-3038 -3039 -3040  0

c i = 627
c  -2+1 --> -1
c    ( b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧  p_627) -> ( b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0)
c  in CNF:
c    -b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨  b^{1, 628}_2
c    -b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_1
c    -b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨  b^{1, 628}_0
c  in DIMACS:
-3041 -3042  3043 -627  3044 0
-3041 -3042  3043 -627 -3045 0
-3041 -3042  3043 -627  3046 0

c  -1+1 --> 0
c    ( b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0 ∧  p_627) -> (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧ -b^{1, 628}_0)
c  in CNF:
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_2
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_1
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_0
c  in DIMACS:
-3041  3042 -3043 -627 -3044 0
-3041  3042 -3043 -627 -3045 0
-3041  3042 -3043 -627 -3046 0

c  0+1 --> 1
c    (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧  p_627) -> (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0)
c  in CNF:
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_2
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_1
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨  b^{1, 628}_0
c  in DIMACS:
 3041  3042  3043 -627 -3044 0
 3041  3042  3043 -627 -3045 0
 3041  3042  3043 -627  3046 0

c  1+1 --> 2
c    (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0 ∧  p_627) -> (-b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0)
c  in CNF:
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_2
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨  b^{1, 628}_1
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ -p_627 ∨ -b^{1, 628}_0
c  in DIMACS:
 3041  3042 -3043 -627 -3044 0
 3041  3042 -3043 -627  3045 0
 3041  3042 -3043 -627 -3046 0

c  2+1 --> break 
c    (-b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧  p_627) -> break
c  in CNF:
c     b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 3041 -3042  3043 -627 1162 0


c  2-1 --> 1
c    (-b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧ -p_627) -> (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0)
c  in CNF:
c     b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_2
c     b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_1
c     b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨  b^{1, 628}_0
c  in DIMACS:
 3041 -3042  3043  627 -3044 0
 3041 -3042  3043  627 -3045 0
 3041 -3042  3043  627  3046 0

c  1-1 --> 0
c    (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0 ∧ -p_627) -> (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧ -b^{1, 628}_0)
c  in CNF:
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_2
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_1
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_0
c  in DIMACS:
 3041  3042 -3043  627 -3044 0
 3041  3042 -3043  627 -3045 0
 3041  3042 -3043  627 -3046 0

c  0-1 --> -1
c    (-b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧ -p_627) -> ( b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0)
c  in CNF:
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨  b^{1, 628}_2
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_1
c     b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨  b^{1, 628}_0
c  in DIMACS:
 3041  3042  3043  627  3044 0
 3041  3042  3043  627 -3045 0
 3041  3042  3043  627  3046 0

c  -1-1 --> -2
c    ( b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧  b^{1, 627}_0 ∧ -p_627) -> ( b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0)
c  in CNF:
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨  b^{1, 628}_2
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨  b^{1, 628}_1
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨  p_627 ∨ -b^{1, 628}_0
c  in DIMACS:
-3041  3042 -3043  627  3044 0
-3041  3042 -3043  627  3045 0
-3041  3042 -3043  627 -3046 0

c  -2-1 --> break 
c    ( b^{1, 627}_2 ∧  b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨  b^{1, 627}_0 ∨  p_627 ∨ break
c  in DIMACS:
-3041 -3042  3043  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 627}_2 ∧ -b^{1, 627}_1 ∧ -b^{1, 627}_0 ∧ true) 
c  in CNF:
c    -b^{1, 627}_2 ∨  b^{1, 627}_1 ∨  b^{1, 627}_0 ∨ false 
c  in DIMACS:
-3041  3042  3043  0

c  3 does not represent an automaton state.
c    -(-b^{1, 627}_2 ∧  b^{1, 627}_1 ∧  b^{1, 627}_0 ∧ true) 
c  in CNF:
c     b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ false 
c  in DIMACS:
 3041 -3042 -3043  0
c  -3 does not represent an automaton state.
c    -( b^{1, 627}_2 ∧  b^{1, 627}_1 ∧  b^{1, 627}_0 ∧ true) 
c  in CNF:
c    -b^{1, 627}_2 ∨ -b^{1, 627}_1 ∨ -b^{1, 627}_0 ∨ false 
c  in DIMACS:
-3041 -3042 -3043  0

c i = 628
c  -2+1 --> -1
c    ( b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧  p_628) -> ( b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0)
c  in CNF:
c    -b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨  b^{1, 629}_2
c    -b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_1
c    -b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨  b^{1, 629}_0
c  in DIMACS:
-3044 -3045  3046 -628  3047 0
-3044 -3045  3046 -628 -3048 0
-3044 -3045  3046 -628  3049 0

c  -1+1 --> 0
c    ( b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0 ∧  p_628) -> (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧ -b^{1, 629}_0)
c  in CNF:
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_2
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_1
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_0
c  in DIMACS:
-3044  3045 -3046 -628 -3047 0
-3044  3045 -3046 -628 -3048 0
-3044  3045 -3046 -628 -3049 0

c  0+1 --> 1
c    (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧  p_628) -> (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0)
c  in CNF:
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_2
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_1
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨  b^{1, 629}_0
c  in DIMACS:
 3044  3045  3046 -628 -3047 0
 3044  3045  3046 -628 -3048 0
 3044  3045  3046 -628  3049 0

c  1+1 --> 2
c    (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0 ∧  p_628) -> (-b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0)
c  in CNF:
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_2
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨  b^{1, 629}_1
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ -p_628 ∨ -b^{1, 629}_0
c  in DIMACS:
 3044  3045 -3046 -628 -3047 0
 3044  3045 -3046 -628  3048 0
 3044  3045 -3046 -628 -3049 0

c  2+1 --> break 
c    (-b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧  p_628) -> break
c  in CNF:
c     b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ -p_628 ∨ break
c  in DIMACS:
 3044 -3045  3046 -628 1162 0


c  2-1 --> 1
c    (-b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧ -p_628) -> (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0)
c  in CNF:
c     b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_2
c     b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_1
c     b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨  b^{1, 629}_0
c  in DIMACS:
 3044 -3045  3046  628 -3047 0
 3044 -3045  3046  628 -3048 0
 3044 -3045  3046  628  3049 0

c  1-1 --> 0
c    (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0 ∧ -p_628) -> (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧ -b^{1, 629}_0)
c  in CNF:
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_2
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_1
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_0
c  in DIMACS:
 3044  3045 -3046  628 -3047 0
 3044  3045 -3046  628 -3048 0
 3044  3045 -3046  628 -3049 0

c  0-1 --> -1
c    (-b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧ -p_628) -> ( b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0)
c  in CNF:
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨  b^{1, 629}_2
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_1
c     b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨  b^{1, 629}_0
c  in DIMACS:
 3044  3045  3046  628  3047 0
 3044  3045  3046  628 -3048 0
 3044  3045  3046  628  3049 0

c  -1-1 --> -2
c    ( b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧  b^{1, 628}_0 ∧ -p_628) -> ( b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0)
c  in CNF:
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨  b^{1, 629}_2
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨  b^{1, 629}_1
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨  p_628 ∨ -b^{1, 629}_0
c  in DIMACS:
-3044  3045 -3046  628  3047 0
-3044  3045 -3046  628  3048 0
-3044  3045 -3046  628 -3049 0

c  -2-1 --> break 
c    ( b^{1, 628}_2 ∧  b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧ -p_628) -> break
c  in CNF:
c    -b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨  b^{1, 628}_0 ∨  p_628 ∨ break
c  in DIMACS:
-3044 -3045  3046  628 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 628}_2 ∧ -b^{1, 628}_1 ∧ -b^{1, 628}_0 ∧ true) 
c  in CNF:
c    -b^{1, 628}_2 ∨  b^{1, 628}_1 ∨  b^{1, 628}_0 ∨ false 
c  in DIMACS:
-3044  3045  3046  0

c  3 does not represent an automaton state.
c    -(-b^{1, 628}_2 ∧  b^{1, 628}_1 ∧  b^{1, 628}_0 ∧ true) 
c  in CNF:
c     b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ false 
c  in DIMACS:
 3044 -3045 -3046  0
c  -3 does not represent an automaton state.
c    -( b^{1, 628}_2 ∧  b^{1, 628}_1 ∧  b^{1, 628}_0 ∧ true) 
c  in CNF:
c    -b^{1, 628}_2 ∨ -b^{1, 628}_1 ∨ -b^{1, 628}_0 ∨ false 
c  in DIMACS:
-3044 -3045 -3046  0

c i = 629
c  -2+1 --> -1
c    ( b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧  p_629) -> ( b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0)
c  in CNF:
c    -b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨  b^{1, 630}_2
c    -b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_1
c    -b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨  b^{1, 630}_0
c  in DIMACS:
-3047 -3048  3049 -629  3050 0
-3047 -3048  3049 -629 -3051 0
-3047 -3048  3049 -629  3052 0

c  -1+1 --> 0
c    ( b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0 ∧  p_629) -> (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧ -b^{1, 630}_0)
c  in CNF:
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_2
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_1
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_0
c  in DIMACS:
-3047  3048 -3049 -629 -3050 0
-3047  3048 -3049 -629 -3051 0
-3047  3048 -3049 -629 -3052 0

c  0+1 --> 1
c    (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧  p_629) -> (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0)
c  in CNF:
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_2
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_1
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨  b^{1, 630}_0
c  in DIMACS:
 3047  3048  3049 -629 -3050 0
 3047  3048  3049 -629 -3051 0
 3047  3048  3049 -629  3052 0

c  1+1 --> 2
c    (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0 ∧  p_629) -> (-b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0)
c  in CNF:
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_2
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨  b^{1, 630}_1
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ -p_629 ∨ -b^{1, 630}_0
c  in DIMACS:
 3047  3048 -3049 -629 -3050 0
 3047  3048 -3049 -629  3051 0
 3047  3048 -3049 -629 -3052 0

c  2+1 --> break 
c    (-b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧  p_629) -> break
c  in CNF:
c     b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ -p_629 ∨ break
c  in DIMACS:
 3047 -3048  3049 -629 1162 0


c  2-1 --> 1
c    (-b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧ -p_629) -> (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0)
c  in CNF:
c     b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_2
c     b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_1
c     b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨  b^{1, 630}_0
c  in DIMACS:
 3047 -3048  3049  629 -3050 0
 3047 -3048  3049  629 -3051 0
 3047 -3048  3049  629  3052 0

c  1-1 --> 0
c    (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0 ∧ -p_629) -> (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧ -b^{1, 630}_0)
c  in CNF:
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_2
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_1
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_0
c  in DIMACS:
 3047  3048 -3049  629 -3050 0
 3047  3048 -3049  629 -3051 0
 3047  3048 -3049  629 -3052 0

c  0-1 --> -1
c    (-b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧ -p_629) -> ( b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0)
c  in CNF:
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨  b^{1, 630}_2
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_1
c     b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨  b^{1, 630}_0
c  in DIMACS:
 3047  3048  3049  629  3050 0
 3047  3048  3049  629 -3051 0
 3047  3048  3049  629  3052 0

c  -1-1 --> -2
c    ( b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧  b^{1, 629}_0 ∧ -p_629) -> ( b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0)
c  in CNF:
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨  b^{1, 630}_2
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨  b^{1, 630}_1
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨  p_629 ∨ -b^{1, 630}_0
c  in DIMACS:
-3047  3048 -3049  629  3050 0
-3047  3048 -3049  629  3051 0
-3047  3048 -3049  629 -3052 0

c  -2-1 --> break 
c    ( b^{1, 629}_2 ∧  b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧ -p_629) -> break
c  in CNF:
c    -b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨  b^{1, 629}_0 ∨  p_629 ∨ break
c  in DIMACS:
-3047 -3048  3049  629 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 629}_2 ∧ -b^{1, 629}_1 ∧ -b^{1, 629}_0 ∧ true) 
c  in CNF:
c    -b^{1, 629}_2 ∨  b^{1, 629}_1 ∨  b^{1, 629}_0 ∨ false 
c  in DIMACS:
-3047  3048  3049  0

c  3 does not represent an automaton state.
c    -(-b^{1, 629}_2 ∧  b^{1, 629}_1 ∧  b^{1, 629}_0 ∧ true) 
c  in CNF:
c     b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ false 
c  in DIMACS:
 3047 -3048 -3049  0
c  -3 does not represent an automaton state.
c    -( b^{1, 629}_2 ∧  b^{1, 629}_1 ∧  b^{1, 629}_0 ∧ true) 
c  in CNF:
c    -b^{1, 629}_2 ∨ -b^{1, 629}_1 ∨ -b^{1, 629}_0 ∨ false 
c  in DIMACS:
-3047 -3048 -3049  0

c i = 630
c  -2+1 --> -1
c    ( b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧  p_630) -> ( b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0)
c  in CNF:
c    -b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨  b^{1, 631}_2
c    -b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_1
c    -b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨  b^{1, 631}_0
c  in DIMACS:
-3050 -3051  3052 -630  3053 0
-3050 -3051  3052 -630 -3054 0
-3050 -3051  3052 -630  3055 0

c  -1+1 --> 0
c    ( b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0 ∧  p_630) -> (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧ -b^{1, 631}_0)
c  in CNF:
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_2
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_1
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_0
c  in DIMACS:
-3050  3051 -3052 -630 -3053 0
-3050  3051 -3052 -630 -3054 0
-3050  3051 -3052 -630 -3055 0

c  0+1 --> 1
c    (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧  p_630) -> (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0)
c  in CNF:
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_2
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_1
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨  b^{1, 631}_0
c  in DIMACS:
 3050  3051  3052 -630 -3053 0
 3050  3051  3052 -630 -3054 0
 3050  3051  3052 -630  3055 0

c  1+1 --> 2
c    (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0 ∧  p_630) -> (-b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0)
c  in CNF:
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_2
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨  b^{1, 631}_1
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ -p_630 ∨ -b^{1, 631}_0
c  in DIMACS:
 3050  3051 -3052 -630 -3053 0
 3050  3051 -3052 -630  3054 0
 3050  3051 -3052 -630 -3055 0

c  2+1 --> break 
c    (-b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧  p_630) -> break
c  in CNF:
c     b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 3050 -3051  3052 -630 1162 0


c  2-1 --> 1
c    (-b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧ -p_630) -> (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0)
c  in CNF:
c     b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_2
c     b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_1
c     b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨  b^{1, 631}_0
c  in DIMACS:
 3050 -3051  3052  630 -3053 0
 3050 -3051  3052  630 -3054 0
 3050 -3051  3052  630  3055 0

c  1-1 --> 0
c    (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0 ∧ -p_630) -> (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧ -b^{1, 631}_0)
c  in CNF:
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_2
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_1
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_0
c  in DIMACS:
 3050  3051 -3052  630 -3053 0
 3050  3051 -3052  630 -3054 0
 3050  3051 -3052  630 -3055 0

c  0-1 --> -1
c    (-b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧ -p_630) -> ( b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0)
c  in CNF:
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨  b^{1, 631}_2
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_1
c     b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨  b^{1, 631}_0
c  in DIMACS:
 3050  3051  3052  630  3053 0
 3050  3051  3052  630 -3054 0
 3050  3051  3052  630  3055 0

c  -1-1 --> -2
c    ( b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧  b^{1, 630}_0 ∧ -p_630) -> ( b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0)
c  in CNF:
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨  b^{1, 631}_2
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨  b^{1, 631}_1
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨  p_630 ∨ -b^{1, 631}_0
c  in DIMACS:
-3050  3051 -3052  630  3053 0
-3050  3051 -3052  630  3054 0
-3050  3051 -3052  630 -3055 0

c  -2-1 --> break 
c    ( b^{1, 630}_2 ∧  b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨  b^{1, 630}_0 ∨  p_630 ∨ break
c  in DIMACS:
-3050 -3051  3052  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 630}_2 ∧ -b^{1, 630}_1 ∧ -b^{1, 630}_0 ∧ true) 
c  in CNF:
c    -b^{1, 630}_2 ∨  b^{1, 630}_1 ∨  b^{1, 630}_0 ∨ false 
c  in DIMACS:
-3050  3051  3052  0

c  3 does not represent an automaton state.
c    -(-b^{1, 630}_2 ∧  b^{1, 630}_1 ∧  b^{1, 630}_0 ∧ true) 
c  in CNF:
c     b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ false 
c  in DIMACS:
 3050 -3051 -3052  0
c  -3 does not represent an automaton state.
c    -( b^{1, 630}_2 ∧  b^{1, 630}_1 ∧  b^{1, 630}_0 ∧ true) 
c  in CNF:
c    -b^{1, 630}_2 ∨ -b^{1, 630}_1 ∨ -b^{1, 630}_0 ∨ false 
c  in DIMACS:
-3050 -3051 -3052  0

c i = 631
c  -2+1 --> -1
c    ( b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧  p_631) -> ( b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0)
c  in CNF:
c    -b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨  b^{1, 632}_2
c    -b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_1
c    -b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨  b^{1, 632}_0
c  in DIMACS:
-3053 -3054  3055 -631  3056 0
-3053 -3054  3055 -631 -3057 0
-3053 -3054  3055 -631  3058 0

c  -1+1 --> 0
c    ( b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0 ∧  p_631) -> (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧ -b^{1, 632}_0)
c  in CNF:
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_2
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_1
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_0
c  in DIMACS:
-3053  3054 -3055 -631 -3056 0
-3053  3054 -3055 -631 -3057 0
-3053  3054 -3055 -631 -3058 0

c  0+1 --> 1
c    (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧  p_631) -> (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0)
c  in CNF:
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_2
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_1
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨  b^{1, 632}_0
c  in DIMACS:
 3053  3054  3055 -631 -3056 0
 3053  3054  3055 -631 -3057 0
 3053  3054  3055 -631  3058 0

c  1+1 --> 2
c    (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0 ∧  p_631) -> (-b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0)
c  in CNF:
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_2
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨  b^{1, 632}_1
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ -p_631 ∨ -b^{1, 632}_0
c  in DIMACS:
 3053  3054 -3055 -631 -3056 0
 3053  3054 -3055 -631  3057 0
 3053  3054 -3055 -631 -3058 0

c  2+1 --> break 
c    (-b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧  p_631) -> break
c  in CNF:
c     b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ -p_631 ∨ break
c  in DIMACS:
 3053 -3054  3055 -631 1162 0


c  2-1 --> 1
c    (-b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧ -p_631) -> (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0)
c  in CNF:
c     b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_2
c     b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_1
c     b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨  b^{1, 632}_0
c  in DIMACS:
 3053 -3054  3055  631 -3056 0
 3053 -3054  3055  631 -3057 0
 3053 -3054  3055  631  3058 0

c  1-1 --> 0
c    (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0 ∧ -p_631) -> (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧ -b^{1, 632}_0)
c  in CNF:
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_2
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_1
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_0
c  in DIMACS:
 3053  3054 -3055  631 -3056 0
 3053  3054 -3055  631 -3057 0
 3053  3054 -3055  631 -3058 0

c  0-1 --> -1
c    (-b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧ -p_631) -> ( b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0)
c  in CNF:
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨  b^{1, 632}_2
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_1
c     b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨  b^{1, 632}_0
c  in DIMACS:
 3053  3054  3055  631  3056 0
 3053  3054  3055  631 -3057 0
 3053  3054  3055  631  3058 0

c  -1-1 --> -2
c    ( b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧  b^{1, 631}_0 ∧ -p_631) -> ( b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0)
c  in CNF:
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨  b^{1, 632}_2
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨  b^{1, 632}_1
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨  p_631 ∨ -b^{1, 632}_0
c  in DIMACS:
-3053  3054 -3055  631  3056 0
-3053  3054 -3055  631  3057 0
-3053  3054 -3055  631 -3058 0

c  -2-1 --> break 
c    ( b^{1, 631}_2 ∧  b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧ -p_631) -> break
c  in CNF:
c    -b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨  b^{1, 631}_0 ∨  p_631 ∨ break
c  in DIMACS:
-3053 -3054  3055  631 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 631}_2 ∧ -b^{1, 631}_1 ∧ -b^{1, 631}_0 ∧ true) 
c  in CNF:
c    -b^{1, 631}_2 ∨  b^{1, 631}_1 ∨  b^{1, 631}_0 ∨ false 
c  in DIMACS:
-3053  3054  3055  0

c  3 does not represent an automaton state.
c    -(-b^{1, 631}_2 ∧  b^{1, 631}_1 ∧  b^{1, 631}_0 ∧ true) 
c  in CNF:
c     b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ false 
c  in DIMACS:
 3053 -3054 -3055  0
c  -3 does not represent an automaton state.
c    -( b^{1, 631}_2 ∧  b^{1, 631}_1 ∧  b^{1, 631}_0 ∧ true) 
c  in CNF:
c    -b^{1, 631}_2 ∨ -b^{1, 631}_1 ∨ -b^{1, 631}_0 ∨ false 
c  in DIMACS:
-3053 -3054 -3055  0

c i = 632
c  -2+1 --> -1
c    ( b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧  p_632) -> ( b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0)
c  in CNF:
c    -b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨  b^{1, 633}_2
c    -b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_1
c    -b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨  b^{1, 633}_0
c  in DIMACS:
-3056 -3057  3058 -632  3059 0
-3056 -3057  3058 -632 -3060 0
-3056 -3057  3058 -632  3061 0

c  -1+1 --> 0
c    ( b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0 ∧  p_632) -> (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧ -b^{1, 633}_0)
c  in CNF:
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_2
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_1
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_0
c  in DIMACS:
-3056  3057 -3058 -632 -3059 0
-3056  3057 -3058 -632 -3060 0
-3056  3057 -3058 -632 -3061 0

c  0+1 --> 1
c    (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧  p_632) -> (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0)
c  in CNF:
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_2
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_1
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨  b^{1, 633}_0
c  in DIMACS:
 3056  3057  3058 -632 -3059 0
 3056  3057  3058 -632 -3060 0
 3056  3057  3058 -632  3061 0

c  1+1 --> 2
c    (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0 ∧  p_632) -> (-b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0)
c  in CNF:
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_2
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨  b^{1, 633}_1
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ -p_632 ∨ -b^{1, 633}_0
c  in DIMACS:
 3056  3057 -3058 -632 -3059 0
 3056  3057 -3058 -632  3060 0
 3056  3057 -3058 -632 -3061 0

c  2+1 --> break 
c    (-b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧  p_632) -> break
c  in CNF:
c     b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 3056 -3057  3058 -632 1162 0


c  2-1 --> 1
c    (-b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧ -p_632) -> (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0)
c  in CNF:
c     b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_2
c     b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_1
c     b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨  b^{1, 633}_0
c  in DIMACS:
 3056 -3057  3058  632 -3059 0
 3056 -3057  3058  632 -3060 0
 3056 -3057  3058  632  3061 0

c  1-1 --> 0
c    (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0 ∧ -p_632) -> (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧ -b^{1, 633}_0)
c  in CNF:
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_2
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_1
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_0
c  in DIMACS:
 3056  3057 -3058  632 -3059 0
 3056  3057 -3058  632 -3060 0
 3056  3057 -3058  632 -3061 0

c  0-1 --> -1
c    (-b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧ -p_632) -> ( b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0)
c  in CNF:
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨  b^{1, 633}_2
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_1
c     b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨  b^{1, 633}_0
c  in DIMACS:
 3056  3057  3058  632  3059 0
 3056  3057  3058  632 -3060 0
 3056  3057  3058  632  3061 0

c  -1-1 --> -2
c    ( b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧  b^{1, 632}_0 ∧ -p_632) -> ( b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0)
c  in CNF:
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨  b^{1, 633}_2
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨  b^{1, 633}_1
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨  p_632 ∨ -b^{1, 633}_0
c  in DIMACS:
-3056  3057 -3058  632  3059 0
-3056  3057 -3058  632  3060 0
-3056  3057 -3058  632 -3061 0

c  -2-1 --> break 
c    ( b^{1, 632}_2 ∧  b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨  b^{1, 632}_0 ∨  p_632 ∨ break
c  in DIMACS:
-3056 -3057  3058  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 632}_2 ∧ -b^{1, 632}_1 ∧ -b^{1, 632}_0 ∧ true) 
c  in CNF:
c    -b^{1, 632}_2 ∨  b^{1, 632}_1 ∨  b^{1, 632}_0 ∨ false 
c  in DIMACS:
-3056  3057  3058  0

c  3 does not represent an automaton state.
c    -(-b^{1, 632}_2 ∧  b^{1, 632}_1 ∧  b^{1, 632}_0 ∧ true) 
c  in CNF:
c     b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ false 
c  in DIMACS:
 3056 -3057 -3058  0
c  -3 does not represent an automaton state.
c    -( b^{1, 632}_2 ∧  b^{1, 632}_1 ∧  b^{1, 632}_0 ∧ true) 
c  in CNF:
c    -b^{1, 632}_2 ∨ -b^{1, 632}_1 ∨ -b^{1, 632}_0 ∨ false 
c  in DIMACS:
-3056 -3057 -3058  0

c i = 633
c  -2+1 --> -1
c    ( b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧  p_633) -> ( b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0)
c  in CNF:
c    -b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨  b^{1, 634}_2
c    -b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_1
c    -b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨  b^{1, 634}_0
c  in DIMACS:
-3059 -3060  3061 -633  3062 0
-3059 -3060  3061 -633 -3063 0
-3059 -3060  3061 -633  3064 0

c  -1+1 --> 0
c    ( b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0 ∧  p_633) -> (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧ -b^{1, 634}_0)
c  in CNF:
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_2
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_1
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_0
c  in DIMACS:
-3059  3060 -3061 -633 -3062 0
-3059  3060 -3061 -633 -3063 0
-3059  3060 -3061 -633 -3064 0

c  0+1 --> 1
c    (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧  p_633) -> (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0)
c  in CNF:
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_2
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_1
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨  b^{1, 634}_0
c  in DIMACS:
 3059  3060  3061 -633 -3062 0
 3059  3060  3061 -633 -3063 0
 3059  3060  3061 -633  3064 0

c  1+1 --> 2
c    (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0 ∧  p_633) -> (-b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0)
c  in CNF:
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_2
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨  b^{1, 634}_1
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ -p_633 ∨ -b^{1, 634}_0
c  in DIMACS:
 3059  3060 -3061 -633 -3062 0
 3059  3060 -3061 -633  3063 0
 3059  3060 -3061 -633 -3064 0

c  2+1 --> break 
c    (-b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧  p_633) -> break
c  in CNF:
c     b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ -p_633 ∨ break
c  in DIMACS:
 3059 -3060  3061 -633 1162 0


c  2-1 --> 1
c    (-b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧ -p_633) -> (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0)
c  in CNF:
c     b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_2
c     b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_1
c     b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨  b^{1, 634}_0
c  in DIMACS:
 3059 -3060  3061  633 -3062 0
 3059 -3060  3061  633 -3063 0
 3059 -3060  3061  633  3064 0

c  1-1 --> 0
c    (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0 ∧ -p_633) -> (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧ -b^{1, 634}_0)
c  in CNF:
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_2
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_1
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_0
c  in DIMACS:
 3059  3060 -3061  633 -3062 0
 3059  3060 -3061  633 -3063 0
 3059  3060 -3061  633 -3064 0

c  0-1 --> -1
c    (-b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧ -p_633) -> ( b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0)
c  in CNF:
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨  b^{1, 634}_2
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_1
c     b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨  b^{1, 634}_0
c  in DIMACS:
 3059  3060  3061  633  3062 0
 3059  3060  3061  633 -3063 0
 3059  3060  3061  633  3064 0

c  -1-1 --> -2
c    ( b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧  b^{1, 633}_0 ∧ -p_633) -> ( b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0)
c  in CNF:
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨  b^{1, 634}_2
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨  b^{1, 634}_1
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨  p_633 ∨ -b^{1, 634}_0
c  in DIMACS:
-3059  3060 -3061  633  3062 0
-3059  3060 -3061  633  3063 0
-3059  3060 -3061  633 -3064 0

c  -2-1 --> break 
c    ( b^{1, 633}_2 ∧  b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧ -p_633) -> break
c  in CNF:
c    -b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨  b^{1, 633}_0 ∨  p_633 ∨ break
c  in DIMACS:
-3059 -3060  3061  633 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 633}_2 ∧ -b^{1, 633}_1 ∧ -b^{1, 633}_0 ∧ true) 
c  in CNF:
c    -b^{1, 633}_2 ∨  b^{1, 633}_1 ∨  b^{1, 633}_0 ∨ false 
c  in DIMACS:
-3059  3060  3061  0

c  3 does not represent an automaton state.
c    -(-b^{1, 633}_2 ∧  b^{1, 633}_1 ∧  b^{1, 633}_0 ∧ true) 
c  in CNF:
c     b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ false 
c  in DIMACS:
 3059 -3060 -3061  0
c  -3 does not represent an automaton state.
c    -( b^{1, 633}_2 ∧  b^{1, 633}_1 ∧  b^{1, 633}_0 ∧ true) 
c  in CNF:
c    -b^{1, 633}_2 ∨ -b^{1, 633}_1 ∨ -b^{1, 633}_0 ∨ false 
c  in DIMACS:
-3059 -3060 -3061  0

c i = 634
c  -2+1 --> -1
c    ( b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧  p_634) -> ( b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0)
c  in CNF:
c    -b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨  b^{1, 635}_2
c    -b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_1
c    -b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨  b^{1, 635}_0
c  in DIMACS:
-3062 -3063  3064 -634  3065 0
-3062 -3063  3064 -634 -3066 0
-3062 -3063  3064 -634  3067 0

c  -1+1 --> 0
c    ( b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0 ∧  p_634) -> (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧ -b^{1, 635}_0)
c  in CNF:
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_2
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_1
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_0
c  in DIMACS:
-3062  3063 -3064 -634 -3065 0
-3062  3063 -3064 -634 -3066 0
-3062  3063 -3064 -634 -3067 0

c  0+1 --> 1
c    (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧  p_634) -> (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0)
c  in CNF:
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_2
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_1
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨  b^{1, 635}_0
c  in DIMACS:
 3062  3063  3064 -634 -3065 0
 3062  3063  3064 -634 -3066 0
 3062  3063  3064 -634  3067 0

c  1+1 --> 2
c    (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0 ∧  p_634) -> (-b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0)
c  in CNF:
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_2
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨  b^{1, 635}_1
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ -p_634 ∨ -b^{1, 635}_0
c  in DIMACS:
 3062  3063 -3064 -634 -3065 0
 3062  3063 -3064 -634  3066 0
 3062  3063 -3064 -634 -3067 0

c  2+1 --> break 
c    (-b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧  p_634) -> break
c  in CNF:
c     b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ -p_634 ∨ break
c  in DIMACS:
 3062 -3063  3064 -634 1162 0


c  2-1 --> 1
c    (-b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧ -p_634) -> (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0)
c  in CNF:
c     b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_2
c     b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_1
c     b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨  b^{1, 635}_0
c  in DIMACS:
 3062 -3063  3064  634 -3065 0
 3062 -3063  3064  634 -3066 0
 3062 -3063  3064  634  3067 0

c  1-1 --> 0
c    (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0 ∧ -p_634) -> (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧ -b^{1, 635}_0)
c  in CNF:
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_2
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_1
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_0
c  in DIMACS:
 3062  3063 -3064  634 -3065 0
 3062  3063 -3064  634 -3066 0
 3062  3063 -3064  634 -3067 0

c  0-1 --> -1
c    (-b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧ -p_634) -> ( b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0)
c  in CNF:
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨  b^{1, 635}_2
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_1
c     b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨  b^{1, 635}_0
c  in DIMACS:
 3062  3063  3064  634  3065 0
 3062  3063  3064  634 -3066 0
 3062  3063  3064  634  3067 0

c  -1-1 --> -2
c    ( b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧  b^{1, 634}_0 ∧ -p_634) -> ( b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0)
c  in CNF:
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨  b^{1, 635}_2
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨  b^{1, 635}_1
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨  p_634 ∨ -b^{1, 635}_0
c  in DIMACS:
-3062  3063 -3064  634  3065 0
-3062  3063 -3064  634  3066 0
-3062  3063 -3064  634 -3067 0

c  -2-1 --> break 
c    ( b^{1, 634}_2 ∧  b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧ -p_634) -> break
c  in CNF:
c    -b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨  b^{1, 634}_0 ∨  p_634 ∨ break
c  in DIMACS:
-3062 -3063  3064  634 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 634}_2 ∧ -b^{1, 634}_1 ∧ -b^{1, 634}_0 ∧ true) 
c  in CNF:
c    -b^{1, 634}_2 ∨  b^{1, 634}_1 ∨  b^{1, 634}_0 ∨ false 
c  in DIMACS:
-3062  3063  3064  0

c  3 does not represent an automaton state.
c    -(-b^{1, 634}_2 ∧  b^{1, 634}_1 ∧  b^{1, 634}_0 ∧ true) 
c  in CNF:
c     b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ false 
c  in DIMACS:
 3062 -3063 -3064  0
c  -3 does not represent an automaton state.
c    -( b^{1, 634}_2 ∧  b^{1, 634}_1 ∧  b^{1, 634}_0 ∧ true) 
c  in CNF:
c    -b^{1, 634}_2 ∨ -b^{1, 634}_1 ∨ -b^{1, 634}_0 ∨ false 
c  in DIMACS:
-3062 -3063 -3064  0

c i = 635
c  -2+1 --> -1
c    ( b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧  p_635) -> ( b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0)
c  in CNF:
c    -b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨  b^{1, 636}_2
c    -b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_1
c    -b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨  b^{1, 636}_0
c  in DIMACS:
-3065 -3066  3067 -635  3068 0
-3065 -3066  3067 -635 -3069 0
-3065 -3066  3067 -635  3070 0

c  -1+1 --> 0
c    ( b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0 ∧  p_635) -> (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧ -b^{1, 636}_0)
c  in CNF:
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_2
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_1
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_0
c  in DIMACS:
-3065  3066 -3067 -635 -3068 0
-3065  3066 -3067 -635 -3069 0
-3065  3066 -3067 -635 -3070 0

c  0+1 --> 1
c    (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧  p_635) -> (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0)
c  in CNF:
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_2
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_1
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨  b^{1, 636}_0
c  in DIMACS:
 3065  3066  3067 -635 -3068 0
 3065  3066  3067 -635 -3069 0
 3065  3066  3067 -635  3070 0

c  1+1 --> 2
c    (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0 ∧  p_635) -> (-b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0)
c  in CNF:
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_2
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨  b^{1, 636}_1
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ -p_635 ∨ -b^{1, 636}_0
c  in DIMACS:
 3065  3066 -3067 -635 -3068 0
 3065  3066 -3067 -635  3069 0
 3065  3066 -3067 -635 -3070 0

c  2+1 --> break 
c    (-b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧  p_635) -> break
c  in CNF:
c     b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ -p_635 ∨ break
c  in DIMACS:
 3065 -3066  3067 -635 1162 0


c  2-1 --> 1
c    (-b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧ -p_635) -> (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0)
c  in CNF:
c     b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_2
c     b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_1
c     b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨  b^{1, 636}_0
c  in DIMACS:
 3065 -3066  3067  635 -3068 0
 3065 -3066  3067  635 -3069 0
 3065 -3066  3067  635  3070 0

c  1-1 --> 0
c    (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0 ∧ -p_635) -> (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧ -b^{1, 636}_0)
c  in CNF:
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_2
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_1
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_0
c  in DIMACS:
 3065  3066 -3067  635 -3068 0
 3065  3066 -3067  635 -3069 0
 3065  3066 -3067  635 -3070 0

c  0-1 --> -1
c    (-b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧ -p_635) -> ( b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0)
c  in CNF:
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨  b^{1, 636}_2
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_1
c     b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨  b^{1, 636}_0
c  in DIMACS:
 3065  3066  3067  635  3068 0
 3065  3066  3067  635 -3069 0
 3065  3066  3067  635  3070 0

c  -1-1 --> -2
c    ( b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧  b^{1, 635}_0 ∧ -p_635) -> ( b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0)
c  in CNF:
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨  b^{1, 636}_2
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨  b^{1, 636}_1
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨  p_635 ∨ -b^{1, 636}_0
c  in DIMACS:
-3065  3066 -3067  635  3068 0
-3065  3066 -3067  635  3069 0
-3065  3066 -3067  635 -3070 0

c  -2-1 --> break 
c    ( b^{1, 635}_2 ∧  b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧ -p_635) -> break
c  in CNF:
c    -b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨  b^{1, 635}_0 ∨  p_635 ∨ break
c  in DIMACS:
-3065 -3066  3067  635 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 635}_2 ∧ -b^{1, 635}_1 ∧ -b^{1, 635}_0 ∧ true) 
c  in CNF:
c    -b^{1, 635}_2 ∨  b^{1, 635}_1 ∨  b^{1, 635}_0 ∨ false 
c  in DIMACS:
-3065  3066  3067  0

c  3 does not represent an automaton state.
c    -(-b^{1, 635}_2 ∧  b^{1, 635}_1 ∧  b^{1, 635}_0 ∧ true) 
c  in CNF:
c     b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ false 
c  in DIMACS:
 3065 -3066 -3067  0
c  -3 does not represent an automaton state.
c    -( b^{1, 635}_2 ∧  b^{1, 635}_1 ∧  b^{1, 635}_0 ∧ true) 
c  in CNF:
c    -b^{1, 635}_2 ∨ -b^{1, 635}_1 ∨ -b^{1, 635}_0 ∨ false 
c  in DIMACS:
-3065 -3066 -3067  0

c i = 636
c  -2+1 --> -1
c    ( b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧  p_636) -> ( b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0)
c  in CNF:
c    -b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨  b^{1, 637}_2
c    -b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_1
c    -b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨  b^{1, 637}_0
c  in DIMACS:
-3068 -3069  3070 -636  3071 0
-3068 -3069  3070 -636 -3072 0
-3068 -3069  3070 -636  3073 0

c  -1+1 --> 0
c    ( b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0 ∧  p_636) -> (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧ -b^{1, 637}_0)
c  in CNF:
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_2
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_1
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_0
c  in DIMACS:
-3068  3069 -3070 -636 -3071 0
-3068  3069 -3070 -636 -3072 0
-3068  3069 -3070 -636 -3073 0

c  0+1 --> 1
c    (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧  p_636) -> (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0)
c  in CNF:
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_2
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_1
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨  b^{1, 637}_0
c  in DIMACS:
 3068  3069  3070 -636 -3071 0
 3068  3069  3070 -636 -3072 0
 3068  3069  3070 -636  3073 0

c  1+1 --> 2
c    (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0 ∧  p_636) -> (-b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0)
c  in CNF:
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_2
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨  b^{1, 637}_1
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ -p_636 ∨ -b^{1, 637}_0
c  in DIMACS:
 3068  3069 -3070 -636 -3071 0
 3068  3069 -3070 -636  3072 0
 3068  3069 -3070 -636 -3073 0

c  2+1 --> break 
c    (-b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧  p_636) -> break
c  in CNF:
c     b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 3068 -3069  3070 -636 1162 0


c  2-1 --> 1
c    (-b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧ -p_636) -> (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0)
c  in CNF:
c     b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_2
c     b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_1
c     b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨  b^{1, 637}_0
c  in DIMACS:
 3068 -3069  3070  636 -3071 0
 3068 -3069  3070  636 -3072 0
 3068 -3069  3070  636  3073 0

c  1-1 --> 0
c    (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0 ∧ -p_636) -> (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧ -b^{1, 637}_0)
c  in CNF:
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_2
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_1
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_0
c  in DIMACS:
 3068  3069 -3070  636 -3071 0
 3068  3069 -3070  636 -3072 0
 3068  3069 -3070  636 -3073 0

c  0-1 --> -1
c    (-b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧ -p_636) -> ( b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0)
c  in CNF:
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨  b^{1, 637}_2
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_1
c     b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨  b^{1, 637}_0
c  in DIMACS:
 3068  3069  3070  636  3071 0
 3068  3069  3070  636 -3072 0
 3068  3069  3070  636  3073 0

c  -1-1 --> -2
c    ( b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧  b^{1, 636}_0 ∧ -p_636) -> ( b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0)
c  in CNF:
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨  b^{1, 637}_2
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨  b^{1, 637}_1
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨  p_636 ∨ -b^{1, 637}_0
c  in DIMACS:
-3068  3069 -3070  636  3071 0
-3068  3069 -3070  636  3072 0
-3068  3069 -3070  636 -3073 0

c  -2-1 --> break 
c    ( b^{1, 636}_2 ∧  b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨  b^{1, 636}_0 ∨  p_636 ∨ break
c  in DIMACS:
-3068 -3069  3070  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 636}_2 ∧ -b^{1, 636}_1 ∧ -b^{1, 636}_0 ∧ true) 
c  in CNF:
c    -b^{1, 636}_2 ∨  b^{1, 636}_1 ∨  b^{1, 636}_0 ∨ false 
c  in DIMACS:
-3068  3069  3070  0

c  3 does not represent an automaton state.
c    -(-b^{1, 636}_2 ∧  b^{1, 636}_1 ∧  b^{1, 636}_0 ∧ true) 
c  in CNF:
c     b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ false 
c  in DIMACS:
 3068 -3069 -3070  0
c  -3 does not represent an automaton state.
c    -( b^{1, 636}_2 ∧  b^{1, 636}_1 ∧  b^{1, 636}_0 ∧ true) 
c  in CNF:
c    -b^{1, 636}_2 ∨ -b^{1, 636}_1 ∨ -b^{1, 636}_0 ∨ false 
c  in DIMACS:
-3068 -3069 -3070  0

c i = 637
c  -2+1 --> -1
c    ( b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧  p_637) -> ( b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0)
c  in CNF:
c    -b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨  b^{1, 638}_2
c    -b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_1
c    -b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨  b^{1, 638}_0
c  in DIMACS:
-3071 -3072  3073 -637  3074 0
-3071 -3072  3073 -637 -3075 0
-3071 -3072  3073 -637  3076 0

c  -1+1 --> 0
c    ( b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0 ∧  p_637) -> (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧ -b^{1, 638}_0)
c  in CNF:
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_2
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_1
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_0
c  in DIMACS:
-3071  3072 -3073 -637 -3074 0
-3071  3072 -3073 -637 -3075 0
-3071  3072 -3073 -637 -3076 0

c  0+1 --> 1
c    (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧  p_637) -> (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0)
c  in CNF:
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_2
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_1
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨  b^{1, 638}_0
c  in DIMACS:
 3071  3072  3073 -637 -3074 0
 3071  3072  3073 -637 -3075 0
 3071  3072  3073 -637  3076 0

c  1+1 --> 2
c    (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0 ∧  p_637) -> (-b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0)
c  in CNF:
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_2
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨  b^{1, 638}_1
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ -p_637 ∨ -b^{1, 638}_0
c  in DIMACS:
 3071  3072 -3073 -637 -3074 0
 3071  3072 -3073 -637  3075 0
 3071  3072 -3073 -637 -3076 0

c  2+1 --> break 
c    (-b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧  p_637) -> break
c  in CNF:
c     b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ -p_637 ∨ break
c  in DIMACS:
 3071 -3072  3073 -637 1162 0


c  2-1 --> 1
c    (-b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧ -p_637) -> (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0)
c  in CNF:
c     b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_2
c     b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_1
c     b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨  b^{1, 638}_0
c  in DIMACS:
 3071 -3072  3073  637 -3074 0
 3071 -3072  3073  637 -3075 0
 3071 -3072  3073  637  3076 0

c  1-1 --> 0
c    (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0 ∧ -p_637) -> (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧ -b^{1, 638}_0)
c  in CNF:
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_2
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_1
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_0
c  in DIMACS:
 3071  3072 -3073  637 -3074 0
 3071  3072 -3073  637 -3075 0
 3071  3072 -3073  637 -3076 0

c  0-1 --> -1
c    (-b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧ -p_637) -> ( b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0)
c  in CNF:
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨  b^{1, 638}_2
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_1
c     b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨  b^{1, 638}_0
c  in DIMACS:
 3071  3072  3073  637  3074 0
 3071  3072  3073  637 -3075 0
 3071  3072  3073  637  3076 0

c  -1-1 --> -2
c    ( b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧  b^{1, 637}_0 ∧ -p_637) -> ( b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0)
c  in CNF:
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨  b^{1, 638}_2
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨  b^{1, 638}_1
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨  p_637 ∨ -b^{1, 638}_0
c  in DIMACS:
-3071  3072 -3073  637  3074 0
-3071  3072 -3073  637  3075 0
-3071  3072 -3073  637 -3076 0

c  -2-1 --> break 
c    ( b^{1, 637}_2 ∧  b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧ -p_637) -> break
c  in CNF:
c    -b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨  b^{1, 637}_0 ∨  p_637 ∨ break
c  in DIMACS:
-3071 -3072  3073  637 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 637}_2 ∧ -b^{1, 637}_1 ∧ -b^{1, 637}_0 ∧ true) 
c  in CNF:
c    -b^{1, 637}_2 ∨  b^{1, 637}_1 ∨  b^{1, 637}_0 ∨ false 
c  in DIMACS:
-3071  3072  3073  0

c  3 does not represent an automaton state.
c    -(-b^{1, 637}_2 ∧  b^{1, 637}_1 ∧  b^{1, 637}_0 ∧ true) 
c  in CNF:
c     b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ false 
c  in DIMACS:
 3071 -3072 -3073  0
c  -3 does not represent an automaton state.
c    -( b^{1, 637}_2 ∧  b^{1, 637}_1 ∧  b^{1, 637}_0 ∧ true) 
c  in CNF:
c    -b^{1, 637}_2 ∨ -b^{1, 637}_1 ∨ -b^{1, 637}_0 ∨ false 
c  in DIMACS:
-3071 -3072 -3073  0

c i = 638
c  -2+1 --> -1
c    ( b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧  p_638) -> ( b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0)
c  in CNF:
c    -b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨  b^{1, 639}_2
c    -b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_1
c    -b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨  b^{1, 639}_0
c  in DIMACS:
-3074 -3075  3076 -638  3077 0
-3074 -3075  3076 -638 -3078 0
-3074 -3075  3076 -638  3079 0

c  -1+1 --> 0
c    ( b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0 ∧  p_638) -> (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧ -b^{1, 639}_0)
c  in CNF:
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_2
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_1
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_0
c  in DIMACS:
-3074  3075 -3076 -638 -3077 0
-3074  3075 -3076 -638 -3078 0
-3074  3075 -3076 -638 -3079 0

c  0+1 --> 1
c    (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧  p_638) -> (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0)
c  in CNF:
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_2
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_1
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨  b^{1, 639}_0
c  in DIMACS:
 3074  3075  3076 -638 -3077 0
 3074  3075  3076 -638 -3078 0
 3074  3075  3076 -638  3079 0

c  1+1 --> 2
c    (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0 ∧  p_638) -> (-b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0)
c  in CNF:
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_2
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨  b^{1, 639}_1
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ -p_638 ∨ -b^{1, 639}_0
c  in DIMACS:
 3074  3075 -3076 -638 -3077 0
 3074  3075 -3076 -638  3078 0
 3074  3075 -3076 -638 -3079 0

c  2+1 --> break 
c    (-b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧  p_638) -> break
c  in CNF:
c     b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 3074 -3075  3076 -638 1162 0


c  2-1 --> 1
c    (-b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧ -p_638) -> (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0)
c  in CNF:
c     b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_2
c     b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_1
c     b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨  b^{1, 639}_0
c  in DIMACS:
 3074 -3075  3076  638 -3077 0
 3074 -3075  3076  638 -3078 0
 3074 -3075  3076  638  3079 0

c  1-1 --> 0
c    (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0 ∧ -p_638) -> (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧ -b^{1, 639}_0)
c  in CNF:
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_2
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_1
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_0
c  in DIMACS:
 3074  3075 -3076  638 -3077 0
 3074  3075 -3076  638 -3078 0
 3074  3075 -3076  638 -3079 0

c  0-1 --> -1
c    (-b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧ -p_638) -> ( b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0)
c  in CNF:
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨  b^{1, 639}_2
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_1
c     b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨  b^{1, 639}_0
c  in DIMACS:
 3074  3075  3076  638  3077 0
 3074  3075  3076  638 -3078 0
 3074  3075  3076  638  3079 0

c  -1-1 --> -2
c    ( b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧  b^{1, 638}_0 ∧ -p_638) -> ( b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0)
c  in CNF:
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨  b^{1, 639}_2
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨  b^{1, 639}_1
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨  p_638 ∨ -b^{1, 639}_0
c  in DIMACS:
-3074  3075 -3076  638  3077 0
-3074  3075 -3076  638  3078 0
-3074  3075 -3076  638 -3079 0

c  -2-1 --> break 
c    ( b^{1, 638}_2 ∧  b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨  b^{1, 638}_0 ∨  p_638 ∨ break
c  in DIMACS:
-3074 -3075  3076  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 638}_2 ∧ -b^{1, 638}_1 ∧ -b^{1, 638}_0 ∧ true) 
c  in CNF:
c    -b^{1, 638}_2 ∨  b^{1, 638}_1 ∨  b^{1, 638}_0 ∨ false 
c  in DIMACS:
-3074  3075  3076  0

c  3 does not represent an automaton state.
c    -(-b^{1, 638}_2 ∧  b^{1, 638}_1 ∧  b^{1, 638}_0 ∧ true) 
c  in CNF:
c     b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ false 
c  in DIMACS:
 3074 -3075 -3076  0
c  -3 does not represent an automaton state.
c    -( b^{1, 638}_2 ∧  b^{1, 638}_1 ∧  b^{1, 638}_0 ∧ true) 
c  in CNF:
c    -b^{1, 638}_2 ∨ -b^{1, 638}_1 ∨ -b^{1, 638}_0 ∨ false 
c  in DIMACS:
-3074 -3075 -3076  0

c i = 639
c  -2+1 --> -1
c    ( b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧  p_639) -> ( b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0)
c  in CNF:
c    -b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨  b^{1, 640}_2
c    -b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_1
c    -b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨  b^{1, 640}_0
c  in DIMACS:
-3077 -3078  3079 -639  3080 0
-3077 -3078  3079 -639 -3081 0
-3077 -3078  3079 -639  3082 0

c  -1+1 --> 0
c    ( b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0 ∧  p_639) -> (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧ -b^{1, 640}_0)
c  in CNF:
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_2
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_1
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_0
c  in DIMACS:
-3077  3078 -3079 -639 -3080 0
-3077  3078 -3079 -639 -3081 0
-3077  3078 -3079 -639 -3082 0

c  0+1 --> 1
c    (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧  p_639) -> (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0)
c  in CNF:
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_2
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_1
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨  b^{1, 640}_0
c  in DIMACS:
 3077  3078  3079 -639 -3080 0
 3077  3078  3079 -639 -3081 0
 3077  3078  3079 -639  3082 0

c  1+1 --> 2
c    (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0 ∧  p_639) -> (-b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0)
c  in CNF:
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_2
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨  b^{1, 640}_1
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ -p_639 ∨ -b^{1, 640}_0
c  in DIMACS:
 3077  3078 -3079 -639 -3080 0
 3077  3078 -3079 -639  3081 0
 3077  3078 -3079 -639 -3082 0

c  2+1 --> break 
c    (-b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧  p_639) -> break
c  in CNF:
c     b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ -p_639 ∨ break
c  in DIMACS:
 3077 -3078  3079 -639 1162 0


c  2-1 --> 1
c    (-b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧ -p_639) -> (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0)
c  in CNF:
c     b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_2
c     b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_1
c     b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨  b^{1, 640}_0
c  in DIMACS:
 3077 -3078  3079  639 -3080 0
 3077 -3078  3079  639 -3081 0
 3077 -3078  3079  639  3082 0

c  1-1 --> 0
c    (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0 ∧ -p_639) -> (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧ -b^{1, 640}_0)
c  in CNF:
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_2
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_1
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_0
c  in DIMACS:
 3077  3078 -3079  639 -3080 0
 3077  3078 -3079  639 -3081 0
 3077  3078 -3079  639 -3082 0

c  0-1 --> -1
c    (-b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧ -p_639) -> ( b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0)
c  in CNF:
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨  b^{1, 640}_2
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_1
c     b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨  b^{1, 640}_0
c  in DIMACS:
 3077  3078  3079  639  3080 0
 3077  3078  3079  639 -3081 0
 3077  3078  3079  639  3082 0

c  -1-1 --> -2
c    ( b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧  b^{1, 639}_0 ∧ -p_639) -> ( b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0)
c  in CNF:
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨  b^{1, 640}_2
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨  b^{1, 640}_1
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨  p_639 ∨ -b^{1, 640}_0
c  in DIMACS:
-3077  3078 -3079  639  3080 0
-3077  3078 -3079  639  3081 0
-3077  3078 -3079  639 -3082 0

c  -2-1 --> break 
c    ( b^{1, 639}_2 ∧  b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧ -p_639) -> break
c  in CNF:
c    -b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨  b^{1, 639}_0 ∨  p_639 ∨ break
c  in DIMACS:
-3077 -3078  3079  639 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 639}_2 ∧ -b^{1, 639}_1 ∧ -b^{1, 639}_0 ∧ true) 
c  in CNF:
c    -b^{1, 639}_2 ∨  b^{1, 639}_1 ∨  b^{1, 639}_0 ∨ false 
c  in DIMACS:
-3077  3078  3079  0

c  3 does not represent an automaton state.
c    -(-b^{1, 639}_2 ∧  b^{1, 639}_1 ∧  b^{1, 639}_0 ∧ true) 
c  in CNF:
c     b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ false 
c  in DIMACS:
 3077 -3078 -3079  0
c  -3 does not represent an automaton state.
c    -( b^{1, 639}_2 ∧  b^{1, 639}_1 ∧  b^{1, 639}_0 ∧ true) 
c  in CNF:
c    -b^{1, 639}_2 ∨ -b^{1, 639}_1 ∨ -b^{1, 639}_0 ∨ false 
c  in DIMACS:
-3077 -3078 -3079  0

c i = 640
c  -2+1 --> -1
c    ( b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧  p_640) -> ( b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0)
c  in CNF:
c    -b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨  b^{1, 641}_2
c    -b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_1
c    -b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨  b^{1, 641}_0
c  in DIMACS:
-3080 -3081  3082 -640  3083 0
-3080 -3081  3082 -640 -3084 0
-3080 -3081  3082 -640  3085 0

c  -1+1 --> 0
c    ( b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0 ∧  p_640) -> (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧ -b^{1, 641}_0)
c  in CNF:
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_2
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_1
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_0
c  in DIMACS:
-3080  3081 -3082 -640 -3083 0
-3080  3081 -3082 -640 -3084 0
-3080  3081 -3082 -640 -3085 0

c  0+1 --> 1
c    (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧  p_640) -> (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0)
c  in CNF:
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_2
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_1
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨  b^{1, 641}_0
c  in DIMACS:
 3080  3081  3082 -640 -3083 0
 3080  3081  3082 -640 -3084 0
 3080  3081  3082 -640  3085 0

c  1+1 --> 2
c    (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0 ∧  p_640) -> (-b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0)
c  in CNF:
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_2
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨  b^{1, 641}_1
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ -p_640 ∨ -b^{1, 641}_0
c  in DIMACS:
 3080  3081 -3082 -640 -3083 0
 3080  3081 -3082 -640  3084 0
 3080  3081 -3082 -640 -3085 0

c  2+1 --> break 
c    (-b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧  p_640) -> break
c  in CNF:
c     b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 3080 -3081  3082 -640 1162 0


c  2-1 --> 1
c    (-b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧ -p_640) -> (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0)
c  in CNF:
c     b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_2
c     b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_1
c     b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨  b^{1, 641}_0
c  in DIMACS:
 3080 -3081  3082  640 -3083 0
 3080 -3081  3082  640 -3084 0
 3080 -3081  3082  640  3085 0

c  1-1 --> 0
c    (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0 ∧ -p_640) -> (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧ -b^{1, 641}_0)
c  in CNF:
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_2
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_1
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_0
c  in DIMACS:
 3080  3081 -3082  640 -3083 0
 3080  3081 -3082  640 -3084 0
 3080  3081 -3082  640 -3085 0

c  0-1 --> -1
c    (-b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧ -p_640) -> ( b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0)
c  in CNF:
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨  b^{1, 641}_2
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_1
c     b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨  b^{1, 641}_0
c  in DIMACS:
 3080  3081  3082  640  3083 0
 3080  3081  3082  640 -3084 0
 3080  3081  3082  640  3085 0

c  -1-1 --> -2
c    ( b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧  b^{1, 640}_0 ∧ -p_640) -> ( b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0)
c  in CNF:
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨  b^{1, 641}_2
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨  b^{1, 641}_1
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨  p_640 ∨ -b^{1, 641}_0
c  in DIMACS:
-3080  3081 -3082  640  3083 0
-3080  3081 -3082  640  3084 0
-3080  3081 -3082  640 -3085 0

c  -2-1 --> break 
c    ( b^{1, 640}_2 ∧  b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨  b^{1, 640}_0 ∨  p_640 ∨ break
c  in DIMACS:
-3080 -3081  3082  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 640}_2 ∧ -b^{1, 640}_1 ∧ -b^{1, 640}_0 ∧ true) 
c  in CNF:
c    -b^{1, 640}_2 ∨  b^{1, 640}_1 ∨  b^{1, 640}_0 ∨ false 
c  in DIMACS:
-3080  3081  3082  0

c  3 does not represent an automaton state.
c    -(-b^{1, 640}_2 ∧  b^{1, 640}_1 ∧  b^{1, 640}_0 ∧ true) 
c  in CNF:
c     b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ false 
c  in DIMACS:
 3080 -3081 -3082  0
c  -3 does not represent an automaton state.
c    -( b^{1, 640}_2 ∧  b^{1, 640}_1 ∧  b^{1, 640}_0 ∧ true) 
c  in CNF:
c    -b^{1, 640}_2 ∨ -b^{1, 640}_1 ∨ -b^{1, 640}_0 ∨ false 
c  in DIMACS:
-3080 -3081 -3082  0

c i = 641
c  -2+1 --> -1
c    ( b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧  p_641) -> ( b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0)
c  in CNF:
c    -b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨  b^{1, 642}_2
c    -b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_1
c    -b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨  b^{1, 642}_0
c  in DIMACS:
-3083 -3084  3085 -641  3086 0
-3083 -3084  3085 -641 -3087 0
-3083 -3084  3085 -641  3088 0

c  -1+1 --> 0
c    ( b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0 ∧  p_641) -> (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧ -b^{1, 642}_0)
c  in CNF:
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_2
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_1
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_0
c  in DIMACS:
-3083  3084 -3085 -641 -3086 0
-3083  3084 -3085 -641 -3087 0
-3083  3084 -3085 -641 -3088 0

c  0+1 --> 1
c    (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧  p_641) -> (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0)
c  in CNF:
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_2
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_1
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨  b^{1, 642}_0
c  in DIMACS:
 3083  3084  3085 -641 -3086 0
 3083  3084  3085 -641 -3087 0
 3083  3084  3085 -641  3088 0

c  1+1 --> 2
c    (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0 ∧  p_641) -> (-b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0)
c  in CNF:
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_2
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨  b^{1, 642}_1
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ -p_641 ∨ -b^{1, 642}_0
c  in DIMACS:
 3083  3084 -3085 -641 -3086 0
 3083  3084 -3085 -641  3087 0
 3083  3084 -3085 -641 -3088 0

c  2+1 --> break 
c    (-b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧  p_641) -> break
c  in CNF:
c     b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ -p_641 ∨ break
c  in DIMACS:
 3083 -3084  3085 -641 1162 0


c  2-1 --> 1
c    (-b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧ -p_641) -> (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0)
c  in CNF:
c     b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_2
c     b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_1
c     b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨  b^{1, 642}_0
c  in DIMACS:
 3083 -3084  3085  641 -3086 0
 3083 -3084  3085  641 -3087 0
 3083 -3084  3085  641  3088 0

c  1-1 --> 0
c    (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0 ∧ -p_641) -> (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧ -b^{1, 642}_0)
c  in CNF:
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_2
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_1
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_0
c  in DIMACS:
 3083  3084 -3085  641 -3086 0
 3083  3084 -3085  641 -3087 0
 3083  3084 -3085  641 -3088 0

c  0-1 --> -1
c    (-b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧ -p_641) -> ( b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0)
c  in CNF:
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨  b^{1, 642}_2
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_1
c     b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨  b^{1, 642}_0
c  in DIMACS:
 3083  3084  3085  641  3086 0
 3083  3084  3085  641 -3087 0
 3083  3084  3085  641  3088 0

c  -1-1 --> -2
c    ( b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧  b^{1, 641}_0 ∧ -p_641) -> ( b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0)
c  in CNF:
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨  b^{1, 642}_2
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨  b^{1, 642}_1
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨  p_641 ∨ -b^{1, 642}_0
c  in DIMACS:
-3083  3084 -3085  641  3086 0
-3083  3084 -3085  641  3087 0
-3083  3084 -3085  641 -3088 0

c  -2-1 --> break 
c    ( b^{1, 641}_2 ∧  b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧ -p_641) -> break
c  in CNF:
c    -b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨  b^{1, 641}_0 ∨  p_641 ∨ break
c  in DIMACS:
-3083 -3084  3085  641 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 641}_2 ∧ -b^{1, 641}_1 ∧ -b^{1, 641}_0 ∧ true) 
c  in CNF:
c    -b^{1, 641}_2 ∨  b^{1, 641}_1 ∨  b^{1, 641}_0 ∨ false 
c  in DIMACS:
-3083  3084  3085  0

c  3 does not represent an automaton state.
c    -(-b^{1, 641}_2 ∧  b^{1, 641}_1 ∧  b^{1, 641}_0 ∧ true) 
c  in CNF:
c     b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ false 
c  in DIMACS:
 3083 -3084 -3085  0
c  -3 does not represent an automaton state.
c    -( b^{1, 641}_2 ∧  b^{1, 641}_1 ∧  b^{1, 641}_0 ∧ true) 
c  in CNF:
c    -b^{1, 641}_2 ∨ -b^{1, 641}_1 ∨ -b^{1, 641}_0 ∨ false 
c  in DIMACS:
-3083 -3084 -3085  0

c i = 642
c  -2+1 --> -1
c    ( b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧  p_642) -> ( b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0)
c  in CNF:
c    -b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨  b^{1, 643}_2
c    -b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_1
c    -b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨  b^{1, 643}_0
c  in DIMACS:
-3086 -3087  3088 -642  3089 0
-3086 -3087  3088 -642 -3090 0
-3086 -3087  3088 -642  3091 0

c  -1+1 --> 0
c    ( b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0 ∧  p_642) -> (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧ -b^{1, 643}_0)
c  in CNF:
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_2
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_1
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_0
c  in DIMACS:
-3086  3087 -3088 -642 -3089 0
-3086  3087 -3088 -642 -3090 0
-3086  3087 -3088 -642 -3091 0

c  0+1 --> 1
c    (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧  p_642) -> (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0)
c  in CNF:
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_2
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_1
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨  b^{1, 643}_0
c  in DIMACS:
 3086  3087  3088 -642 -3089 0
 3086  3087  3088 -642 -3090 0
 3086  3087  3088 -642  3091 0

c  1+1 --> 2
c    (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0 ∧  p_642) -> (-b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0)
c  in CNF:
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_2
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨  b^{1, 643}_1
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ -p_642 ∨ -b^{1, 643}_0
c  in DIMACS:
 3086  3087 -3088 -642 -3089 0
 3086  3087 -3088 -642  3090 0
 3086  3087 -3088 -642 -3091 0

c  2+1 --> break 
c    (-b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧  p_642) -> break
c  in CNF:
c     b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 3086 -3087  3088 -642 1162 0


c  2-1 --> 1
c    (-b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧ -p_642) -> (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0)
c  in CNF:
c     b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_2
c     b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_1
c     b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨  b^{1, 643}_0
c  in DIMACS:
 3086 -3087  3088  642 -3089 0
 3086 -3087  3088  642 -3090 0
 3086 -3087  3088  642  3091 0

c  1-1 --> 0
c    (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0 ∧ -p_642) -> (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧ -b^{1, 643}_0)
c  in CNF:
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_2
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_1
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_0
c  in DIMACS:
 3086  3087 -3088  642 -3089 0
 3086  3087 -3088  642 -3090 0
 3086  3087 -3088  642 -3091 0

c  0-1 --> -1
c    (-b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧ -p_642) -> ( b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0)
c  in CNF:
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨  b^{1, 643}_2
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_1
c     b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨  b^{1, 643}_0
c  in DIMACS:
 3086  3087  3088  642  3089 0
 3086  3087  3088  642 -3090 0
 3086  3087  3088  642  3091 0

c  -1-1 --> -2
c    ( b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧  b^{1, 642}_0 ∧ -p_642) -> ( b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0)
c  in CNF:
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨  b^{1, 643}_2
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨  b^{1, 643}_1
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨  p_642 ∨ -b^{1, 643}_0
c  in DIMACS:
-3086  3087 -3088  642  3089 0
-3086  3087 -3088  642  3090 0
-3086  3087 -3088  642 -3091 0

c  -2-1 --> break 
c    ( b^{1, 642}_2 ∧  b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨  b^{1, 642}_0 ∨  p_642 ∨ break
c  in DIMACS:
-3086 -3087  3088  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 642}_2 ∧ -b^{1, 642}_1 ∧ -b^{1, 642}_0 ∧ true) 
c  in CNF:
c    -b^{1, 642}_2 ∨  b^{1, 642}_1 ∨  b^{1, 642}_0 ∨ false 
c  in DIMACS:
-3086  3087  3088  0

c  3 does not represent an automaton state.
c    -(-b^{1, 642}_2 ∧  b^{1, 642}_1 ∧  b^{1, 642}_0 ∧ true) 
c  in CNF:
c     b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ false 
c  in DIMACS:
 3086 -3087 -3088  0
c  -3 does not represent an automaton state.
c    -( b^{1, 642}_2 ∧  b^{1, 642}_1 ∧  b^{1, 642}_0 ∧ true) 
c  in CNF:
c    -b^{1, 642}_2 ∨ -b^{1, 642}_1 ∨ -b^{1, 642}_0 ∨ false 
c  in DIMACS:
-3086 -3087 -3088  0

c i = 643
c  -2+1 --> -1
c    ( b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧  p_643) -> ( b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0)
c  in CNF:
c    -b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨  b^{1, 644}_2
c    -b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_1
c    -b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨  b^{1, 644}_0
c  in DIMACS:
-3089 -3090  3091 -643  3092 0
-3089 -3090  3091 -643 -3093 0
-3089 -3090  3091 -643  3094 0

c  -1+1 --> 0
c    ( b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0 ∧  p_643) -> (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧ -b^{1, 644}_0)
c  in CNF:
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_2
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_1
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_0
c  in DIMACS:
-3089  3090 -3091 -643 -3092 0
-3089  3090 -3091 -643 -3093 0
-3089  3090 -3091 -643 -3094 0

c  0+1 --> 1
c    (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧  p_643) -> (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0)
c  in CNF:
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_2
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_1
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨  b^{1, 644}_0
c  in DIMACS:
 3089  3090  3091 -643 -3092 0
 3089  3090  3091 -643 -3093 0
 3089  3090  3091 -643  3094 0

c  1+1 --> 2
c    (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0 ∧  p_643) -> (-b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0)
c  in CNF:
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_2
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨  b^{1, 644}_1
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ -p_643 ∨ -b^{1, 644}_0
c  in DIMACS:
 3089  3090 -3091 -643 -3092 0
 3089  3090 -3091 -643  3093 0
 3089  3090 -3091 -643 -3094 0

c  2+1 --> break 
c    (-b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧  p_643) -> break
c  in CNF:
c     b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ -p_643 ∨ break
c  in DIMACS:
 3089 -3090  3091 -643 1162 0


c  2-1 --> 1
c    (-b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧ -p_643) -> (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0)
c  in CNF:
c     b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_2
c     b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_1
c     b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨  b^{1, 644}_0
c  in DIMACS:
 3089 -3090  3091  643 -3092 0
 3089 -3090  3091  643 -3093 0
 3089 -3090  3091  643  3094 0

c  1-1 --> 0
c    (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0 ∧ -p_643) -> (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧ -b^{1, 644}_0)
c  in CNF:
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_2
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_1
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_0
c  in DIMACS:
 3089  3090 -3091  643 -3092 0
 3089  3090 -3091  643 -3093 0
 3089  3090 -3091  643 -3094 0

c  0-1 --> -1
c    (-b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧ -p_643) -> ( b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0)
c  in CNF:
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨  b^{1, 644}_2
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_1
c     b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨  b^{1, 644}_0
c  in DIMACS:
 3089  3090  3091  643  3092 0
 3089  3090  3091  643 -3093 0
 3089  3090  3091  643  3094 0

c  -1-1 --> -2
c    ( b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧  b^{1, 643}_0 ∧ -p_643) -> ( b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0)
c  in CNF:
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨  b^{1, 644}_2
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨  b^{1, 644}_1
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨  p_643 ∨ -b^{1, 644}_0
c  in DIMACS:
-3089  3090 -3091  643  3092 0
-3089  3090 -3091  643  3093 0
-3089  3090 -3091  643 -3094 0

c  -2-1 --> break 
c    ( b^{1, 643}_2 ∧  b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧ -p_643) -> break
c  in CNF:
c    -b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨  b^{1, 643}_0 ∨  p_643 ∨ break
c  in DIMACS:
-3089 -3090  3091  643 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 643}_2 ∧ -b^{1, 643}_1 ∧ -b^{1, 643}_0 ∧ true) 
c  in CNF:
c    -b^{1, 643}_2 ∨  b^{1, 643}_1 ∨  b^{1, 643}_0 ∨ false 
c  in DIMACS:
-3089  3090  3091  0

c  3 does not represent an automaton state.
c    -(-b^{1, 643}_2 ∧  b^{1, 643}_1 ∧  b^{1, 643}_0 ∧ true) 
c  in CNF:
c     b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ false 
c  in DIMACS:
 3089 -3090 -3091  0
c  -3 does not represent an automaton state.
c    -( b^{1, 643}_2 ∧  b^{1, 643}_1 ∧  b^{1, 643}_0 ∧ true) 
c  in CNF:
c    -b^{1, 643}_2 ∨ -b^{1, 643}_1 ∨ -b^{1, 643}_0 ∨ false 
c  in DIMACS:
-3089 -3090 -3091  0

c i = 644
c  -2+1 --> -1
c    ( b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧  p_644) -> ( b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0)
c  in CNF:
c    -b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨  b^{1, 645}_2
c    -b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_1
c    -b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨  b^{1, 645}_0
c  in DIMACS:
-3092 -3093  3094 -644  3095 0
-3092 -3093  3094 -644 -3096 0
-3092 -3093  3094 -644  3097 0

c  -1+1 --> 0
c    ( b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0 ∧  p_644) -> (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧ -b^{1, 645}_0)
c  in CNF:
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_2
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_1
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_0
c  in DIMACS:
-3092  3093 -3094 -644 -3095 0
-3092  3093 -3094 -644 -3096 0
-3092  3093 -3094 -644 -3097 0

c  0+1 --> 1
c    (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧  p_644) -> (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0)
c  in CNF:
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_2
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_1
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨  b^{1, 645}_0
c  in DIMACS:
 3092  3093  3094 -644 -3095 0
 3092  3093  3094 -644 -3096 0
 3092  3093  3094 -644  3097 0

c  1+1 --> 2
c    (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0 ∧  p_644) -> (-b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0)
c  in CNF:
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_2
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨  b^{1, 645}_1
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ -p_644 ∨ -b^{1, 645}_0
c  in DIMACS:
 3092  3093 -3094 -644 -3095 0
 3092  3093 -3094 -644  3096 0
 3092  3093 -3094 -644 -3097 0

c  2+1 --> break 
c    (-b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧  p_644) -> break
c  in CNF:
c     b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 3092 -3093  3094 -644 1162 0


c  2-1 --> 1
c    (-b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧ -p_644) -> (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0)
c  in CNF:
c     b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_2
c     b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_1
c     b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨  b^{1, 645}_0
c  in DIMACS:
 3092 -3093  3094  644 -3095 0
 3092 -3093  3094  644 -3096 0
 3092 -3093  3094  644  3097 0

c  1-1 --> 0
c    (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0 ∧ -p_644) -> (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧ -b^{1, 645}_0)
c  in CNF:
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_2
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_1
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_0
c  in DIMACS:
 3092  3093 -3094  644 -3095 0
 3092  3093 -3094  644 -3096 0
 3092  3093 -3094  644 -3097 0

c  0-1 --> -1
c    (-b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧ -p_644) -> ( b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0)
c  in CNF:
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨  b^{1, 645}_2
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_1
c     b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨  b^{1, 645}_0
c  in DIMACS:
 3092  3093  3094  644  3095 0
 3092  3093  3094  644 -3096 0
 3092  3093  3094  644  3097 0

c  -1-1 --> -2
c    ( b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧  b^{1, 644}_0 ∧ -p_644) -> ( b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0)
c  in CNF:
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨  b^{1, 645}_2
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨  b^{1, 645}_1
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨  p_644 ∨ -b^{1, 645}_0
c  in DIMACS:
-3092  3093 -3094  644  3095 0
-3092  3093 -3094  644  3096 0
-3092  3093 -3094  644 -3097 0

c  -2-1 --> break 
c    ( b^{1, 644}_2 ∧  b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨  b^{1, 644}_0 ∨  p_644 ∨ break
c  in DIMACS:
-3092 -3093  3094  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 644}_2 ∧ -b^{1, 644}_1 ∧ -b^{1, 644}_0 ∧ true) 
c  in CNF:
c    -b^{1, 644}_2 ∨  b^{1, 644}_1 ∨  b^{1, 644}_0 ∨ false 
c  in DIMACS:
-3092  3093  3094  0

c  3 does not represent an automaton state.
c    -(-b^{1, 644}_2 ∧  b^{1, 644}_1 ∧  b^{1, 644}_0 ∧ true) 
c  in CNF:
c     b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ false 
c  in DIMACS:
 3092 -3093 -3094  0
c  -3 does not represent an automaton state.
c    -( b^{1, 644}_2 ∧  b^{1, 644}_1 ∧  b^{1, 644}_0 ∧ true) 
c  in CNF:
c    -b^{1, 644}_2 ∨ -b^{1, 644}_1 ∨ -b^{1, 644}_0 ∨ false 
c  in DIMACS:
-3092 -3093 -3094  0

c i = 645
c  -2+1 --> -1
c    ( b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧  p_645) -> ( b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0)
c  in CNF:
c    -b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨  b^{1, 646}_2
c    -b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_1
c    -b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨  b^{1, 646}_0
c  in DIMACS:
-3095 -3096  3097 -645  3098 0
-3095 -3096  3097 -645 -3099 0
-3095 -3096  3097 -645  3100 0

c  -1+1 --> 0
c    ( b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0 ∧  p_645) -> (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧ -b^{1, 646}_0)
c  in CNF:
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_2
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_1
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_0
c  in DIMACS:
-3095  3096 -3097 -645 -3098 0
-3095  3096 -3097 -645 -3099 0
-3095  3096 -3097 -645 -3100 0

c  0+1 --> 1
c    (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧  p_645) -> (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0)
c  in CNF:
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_2
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_1
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨  b^{1, 646}_0
c  in DIMACS:
 3095  3096  3097 -645 -3098 0
 3095  3096  3097 -645 -3099 0
 3095  3096  3097 -645  3100 0

c  1+1 --> 2
c    (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0 ∧  p_645) -> (-b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0)
c  in CNF:
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_2
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨  b^{1, 646}_1
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ -p_645 ∨ -b^{1, 646}_0
c  in DIMACS:
 3095  3096 -3097 -645 -3098 0
 3095  3096 -3097 -645  3099 0
 3095  3096 -3097 -645 -3100 0

c  2+1 --> break 
c    (-b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧  p_645) -> break
c  in CNF:
c     b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 3095 -3096  3097 -645 1162 0


c  2-1 --> 1
c    (-b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧ -p_645) -> (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0)
c  in CNF:
c     b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_2
c     b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_1
c     b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨  b^{1, 646}_0
c  in DIMACS:
 3095 -3096  3097  645 -3098 0
 3095 -3096  3097  645 -3099 0
 3095 -3096  3097  645  3100 0

c  1-1 --> 0
c    (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0 ∧ -p_645) -> (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧ -b^{1, 646}_0)
c  in CNF:
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_2
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_1
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_0
c  in DIMACS:
 3095  3096 -3097  645 -3098 0
 3095  3096 -3097  645 -3099 0
 3095  3096 -3097  645 -3100 0

c  0-1 --> -1
c    (-b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧ -p_645) -> ( b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0)
c  in CNF:
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨  b^{1, 646}_2
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_1
c     b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨  b^{1, 646}_0
c  in DIMACS:
 3095  3096  3097  645  3098 0
 3095  3096  3097  645 -3099 0
 3095  3096  3097  645  3100 0

c  -1-1 --> -2
c    ( b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧  b^{1, 645}_0 ∧ -p_645) -> ( b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0)
c  in CNF:
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨  b^{1, 646}_2
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨  b^{1, 646}_1
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨  p_645 ∨ -b^{1, 646}_0
c  in DIMACS:
-3095  3096 -3097  645  3098 0
-3095  3096 -3097  645  3099 0
-3095  3096 -3097  645 -3100 0

c  -2-1 --> break 
c    ( b^{1, 645}_2 ∧  b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨  b^{1, 645}_0 ∨  p_645 ∨ break
c  in DIMACS:
-3095 -3096  3097  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 645}_2 ∧ -b^{1, 645}_1 ∧ -b^{1, 645}_0 ∧ true) 
c  in CNF:
c    -b^{1, 645}_2 ∨  b^{1, 645}_1 ∨  b^{1, 645}_0 ∨ false 
c  in DIMACS:
-3095  3096  3097  0

c  3 does not represent an automaton state.
c    -(-b^{1, 645}_2 ∧  b^{1, 645}_1 ∧  b^{1, 645}_0 ∧ true) 
c  in CNF:
c     b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ false 
c  in DIMACS:
 3095 -3096 -3097  0
c  -3 does not represent an automaton state.
c    -( b^{1, 645}_2 ∧  b^{1, 645}_1 ∧  b^{1, 645}_0 ∧ true) 
c  in CNF:
c    -b^{1, 645}_2 ∨ -b^{1, 645}_1 ∨ -b^{1, 645}_0 ∨ false 
c  in DIMACS:
-3095 -3096 -3097  0

c i = 646
c  -2+1 --> -1
c    ( b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧  p_646) -> ( b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0)
c  in CNF:
c    -b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨  b^{1, 647}_2
c    -b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_1
c    -b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨  b^{1, 647}_0
c  in DIMACS:
-3098 -3099  3100 -646  3101 0
-3098 -3099  3100 -646 -3102 0
-3098 -3099  3100 -646  3103 0

c  -1+1 --> 0
c    ( b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0 ∧  p_646) -> (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧ -b^{1, 647}_0)
c  in CNF:
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_2
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_1
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_0
c  in DIMACS:
-3098  3099 -3100 -646 -3101 0
-3098  3099 -3100 -646 -3102 0
-3098  3099 -3100 -646 -3103 0

c  0+1 --> 1
c    (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧  p_646) -> (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0)
c  in CNF:
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_2
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_1
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨  b^{1, 647}_0
c  in DIMACS:
 3098  3099  3100 -646 -3101 0
 3098  3099  3100 -646 -3102 0
 3098  3099  3100 -646  3103 0

c  1+1 --> 2
c    (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0 ∧  p_646) -> (-b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0)
c  in CNF:
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_2
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨  b^{1, 647}_1
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ -p_646 ∨ -b^{1, 647}_0
c  in DIMACS:
 3098  3099 -3100 -646 -3101 0
 3098  3099 -3100 -646  3102 0
 3098  3099 -3100 -646 -3103 0

c  2+1 --> break 
c    (-b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧  p_646) -> break
c  in CNF:
c     b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 3098 -3099  3100 -646 1162 0


c  2-1 --> 1
c    (-b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧ -p_646) -> (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0)
c  in CNF:
c     b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_2
c     b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_1
c     b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨  b^{1, 647}_0
c  in DIMACS:
 3098 -3099  3100  646 -3101 0
 3098 -3099  3100  646 -3102 0
 3098 -3099  3100  646  3103 0

c  1-1 --> 0
c    (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0 ∧ -p_646) -> (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧ -b^{1, 647}_0)
c  in CNF:
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_2
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_1
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_0
c  in DIMACS:
 3098  3099 -3100  646 -3101 0
 3098  3099 -3100  646 -3102 0
 3098  3099 -3100  646 -3103 0

c  0-1 --> -1
c    (-b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧ -p_646) -> ( b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0)
c  in CNF:
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨  b^{1, 647}_2
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_1
c     b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨  b^{1, 647}_0
c  in DIMACS:
 3098  3099  3100  646  3101 0
 3098  3099  3100  646 -3102 0
 3098  3099  3100  646  3103 0

c  -1-1 --> -2
c    ( b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧  b^{1, 646}_0 ∧ -p_646) -> ( b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0)
c  in CNF:
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨  b^{1, 647}_2
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨  b^{1, 647}_1
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨  p_646 ∨ -b^{1, 647}_0
c  in DIMACS:
-3098  3099 -3100  646  3101 0
-3098  3099 -3100  646  3102 0
-3098  3099 -3100  646 -3103 0

c  -2-1 --> break 
c    ( b^{1, 646}_2 ∧  b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨  b^{1, 646}_0 ∨  p_646 ∨ break
c  in DIMACS:
-3098 -3099  3100  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 646}_2 ∧ -b^{1, 646}_1 ∧ -b^{1, 646}_0 ∧ true) 
c  in CNF:
c    -b^{1, 646}_2 ∨  b^{1, 646}_1 ∨  b^{1, 646}_0 ∨ false 
c  in DIMACS:
-3098  3099  3100  0

c  3 does not represent an automaton state.
c    -(-b^{1, 646}_2 ∧  b^{1, 646}_1 ∧  b^{1, 646}_0 ∧ true) 
c  in CNF:
c     b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ false 
c  in DIMACS:
 3098 -3099 -3100  0
c  -3 does not represent an automaton state.
c    -( b^{1, 646}_2 ∧  b^{1, 646}_1 ∧  b^{1, 646}_0 ∧ true) 
c  in CNF:
c    -b^{1, 646}_2 ∨ -b^{1, 646}_1 ∨ -b^{1, 646}_0 ∨ false 
c  in DIMACS:
-3098 -3099 -3100  0

c i = 647
c  -2+1 --> -1
c    ( b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧  p_647) -> ( b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0)
c  in CNF:
c    -b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨  b^{1, 648}_2
c    -b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_1
c    -b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨  b^{1, 648}_0
c  in DIMACS:
-3101 -3102  3103 -647  3104 0
-3101 -3102  3103 -647 -3105 0
-3101 -3102  3103 -647  3106 0

c  -1+1 --> 0
c    ( b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0 ∧  p_647) -> (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧ -b^{1, 648}_0)
c  in CNF:
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_2
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_1
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_0
c  in DIMACS:
-3101  3102 -3103 -647 -3104 0
-3101  3102 -3103 -647 -3105 0
-3101  3102 -3103 -647 -3106 0

c  0+1 --> 1
c    (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧  p_647) -> (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0)
c  in CNF:
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_2
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_1
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨  b^{1, 648}_0
c  in DIMACS:
 3101  3102  3103 -647 -3104 0
 3101  3102  3103 -647 -3105 0
 3101  3102  3103 -647  3106 0

c  1+1 --> 2
c    (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0 ∧  p_647) -> (-b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0)
c  in CNF:
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_2
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨  b^{1, 648}_1
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ -p_647 ∨ -b^{1, 648}_0
c  in DIMACS:
 3101  3102 -3103 -647 -3104 0
 3101  3102 -3103 -647  3105 0
 3101  3102 -3103 -647 -3106 0

c  2+1 --> break 
c    (-b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧  p_647) -> break
c  in CNF:
c     b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ -p_647 ∨ break
c  in DIMACS:
 3101 -3102  3103 -647 1162 0


c  2-1 --> 1
c    (-b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧ -p_647) -> (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0)
c  in CNF:
c     b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_2
c     b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_1
c     b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨  b^{1, 648}_0
c  in DIMACS:
 3101 -3102  3103  647 -3104 0
 3101 -3102  3103  647 -3105 0
 3101 -3102  3103  647  3106 0

c  1-1 --> 0
c    (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0 ∧ -p_647) -> (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧ -b^{1, 648}_0)
c  in CNF:
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_2
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_1
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_0
c  in DIMACS:
 3101  3102 -3103  647 -3104 0
 3101  3102 -3103  647 -3105 0
 3101  3102 -3103  647 -3106 0

c  0-1 --> -1
c    (-b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧ -p_647) -> ( b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0)
c  in CNF:
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨  b^{1, 648}_2
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_1
c     b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨  b^{1, 648}_0
c  in DIMACS:
 3101  3102  3103  647  3104 0
 3101  3102  3103  647 -3105 0
 3101  3102  3103  647  3106 0

c  -1-1 --> -2
c    ( b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧  b^{1, 647}_0 ∧ -p_647) -> ( b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0)
c  in CNF:
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨  b^{1, 648}_2
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨  b^{1, 648}_1
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨  p_647 ∨ -b^{1, 648}_0
c  in DIMACS:
-3101  3102 -3103  647  3104 0
-3101  3102 -3103  647  3105 0
-3101  3102 -3103  647 -3106 0

c  -2-1 --> break 
c    ( b^{1, 647}_2 ∧  b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧ -p_647) -> break
c  in CNF:
c    -b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨  b^{1, 647}_0 ∨  p_647 ∨ break
c  in DIMACS:
-3101 -3102  3103  647 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 647}_2 ∧ -b^{1, 647}_1 ∧ -b^{1, 647}_0 ∧ true) 
c  in CNF:
c    -b^{1, 647}_2 ∨  b^{1, 647}_1 ∨  b^{1, 647}_0 ∨ false 
c  in DIMACS:
-3101  3102  3103  0

c  3 does not represent an automaton state.
c    -(-b^{1, 647}_2 ∧  b^{1, 647}_1 ∧  b^{1, 647}_0 ∧ true) 
c  in CNF:
c     b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ false 
c  in DIMACS:
 3101 -3102 -3103  0
c  -3 does not represent an automaton state.
c    -( b^{1, 647}_2 ∧  b^{1, 647}_1 ∧  b^{1, 647}_0 ∧ true) 
c  in CNF:
c    -b^{1, 647}_2 ∨ -b^{1, 647}_1 ∨ -b^{1, 647}_0 ∨ false 
c  in DIMACS:
-3101 -3102 -3103  0

c i = 648
c  -2+1 --> -1
c    ( b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧  p_648) -> ( b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0)
c  in CNF:
c    -b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨  b^{1, 649}_2
c    -b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_1
c    -b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨  b^{1, 649}_0
c  in DIMACS:
-3104 -3105  3106 -648  3107 0
-3104 -3105  3106 -648 -3108 0
-3104 -3105  3106 -648  3109 0

c  -1+1 --> 0
c    ( b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0 ∧  p_648) -> (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧ -b^{1, 649}_0)
c  in CNF:
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_2
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_1
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_0
c  in DIMACS:
-3104  3105 -3106 -648 -3107 0
-3104  3105 -3106 -648 -3108 0
-3104  3105 -3106 -648 -3109 0

c  0+1 --> 1
c    (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧  p_648) -> (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0)
c  in CNF:
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_2
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_1
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨  b^{1, 649}_0
c  in DIMACS:
 3104  3105  3106 -648 -3107 0
 3104  3105  3106 -648 -3108 0
 3104  3105  3106 -648  3109 0

c  1+1 --> 2
c    (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0 ∧  p_648) -> (-b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0)
c  in CNF:
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_2
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨  b^{1, 649}_1
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ -p_648 ∨ -b^{1, 649}_0
c  in DIMACS:
 3104  3105 -3106 -648 -3107 0
 3104  3105 -3106 -648  3108 0
 3104  3105 -3106 -648 -3109 0

c  2+1 --> break 
c    (-b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧  p_648) -> break
c  in CNF:
c     b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 3104 -3105  3106 -648 1162 0


c  2-1 --> 1
c    (-b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧ -p_648) -> (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0)
c  in CNF:
c     b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_2
c     b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_1
c     b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨  b^{1, 649}_0
c  in DIMACS:
 3104 -3105  3106  648 -3107 0
 3104 -3105  3106  648 -3108 0
 3104 -3105  3106  648  3109 0

c  1-1 --> 0
c    (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0 ∧ -p_648) -> (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧ -b^{1, 649}_0)
c  in CNF:
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_2
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_1
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_0
c  in DIMACS:
 3104  3105 -3106  648 -3107 0
 3104  3105 -3106  648 -3108 0
 3104  3105 -3106  648 -3109 0

c  0-1 --> -1
c    (-b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧ -p_648) -> ( b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0)
c  in CNF:
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨  b^{1, 649}_2
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_1
c     b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨  b^{1, 649}_0
c  in DIMACS:
 3104  3105  3106  648  3107 0
 3104  3105  3106  648 -3108 0
 3104  3105  3106  648  3109 0

c  -1-1 --> -2
c    ( b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧  b^{1, 648}_0 ∧ -p_648) -> ( b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0)
c  in CNF:
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨  b^{1, 649}_2
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨  b^{1, 649}_1
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨  p_648 ∨ -b^{1, 649}_0
c  in DIMACS:
-3104  3105 -3106  648  3107 0
-3104  3105 -3106  648  3108 0
-3104  3105 -3106  648 -3109 0

c  -2-1 --> break 
c    ( b^{1, 648}_2 ∧  b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨  b^{1, 648}_0 ∨  p_648 ∨ break
c  in DIMACS:
-3104 -3105  3106  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 648}_2 ∧ -b^{1, 648}_1 ∧ -b^{1, 648}_0 ∧ true) 
c  in CNF:
c    -b^{1, 648}_2 ∨  b^{1, 648}_1 ∨  b^{1, 648}_0 ∨ false 
c  in DIMACS:
-3104  3105  3106  0

c  3 does not represent an automaton state.
c    -(-b^{1, 648}_2 ∧  b^{1, 648}_1 ∧  b^{1, 648}_0 ∧ true) 
c  in CNF:
c     b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ false 
c  in DIMACS:
 3104 -3105 -3106  0
c  -3 does not represent an automaton state.
c    -( b^{1, 648}_2 ∧  b^{1, 648}_1 ∧  b^{1, 648}_0 ∧ true) 
c  in CNF:
c    -b^{1, 648}_2 ∨ -b^{1, 648}_1 ∨ -b^{1, 648}_0 ∨ false 
c  in DIMACS:
-3104 -3105 -3106  0

c i = 649
c  -2+1 --> -1
c    ( b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧  p_649) -> ( b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0)
c  in CNF:
c    -b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨  b^{1, 650}_2
c    -b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_1
c    -b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨  b^{1, 650}_0
c  in DIMACS:
-3107 -3108  3109 -649  3110 0
-3107 -3108  3109 -649 -3111 0
-3107 -3108  3109 -649  3112 0

c  -1+1 --> 0
c    ( b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0 ∧  p_649) -> (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧ -b^{1, 650}_0)
c  in CNF:
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_2
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_1
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_0
c  in DIMACS:
-3107  3108 -3109 -649 -3110 0
-3107  3108 -3109 -649 -3111 0
-3107  3108 -3109 -649 -3112 0

c  0+1 --> 1
c    (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧  p_649) -> (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0)
c  in CNF:
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_2
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_1
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨  b^{1, 650}_0
c  in DIMACS:
 3107  3108  3109 -649 -3110 0
 3107  3108  3109 -649 -3111 0
 3107  3108  3109 -649  3112 0

c  1+1 --> 2
c    (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0 ∧  p_649) -> (-b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0)
c  in CNF:
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_2
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨  b^{1, 650}_1
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ -p_649 ∨ -b^{1, 650}_0
c  in DIMACS:
 3107  3108 -3109 -649 -3110 0
 3107  3108 -3109 -649  3111 0
 3107  3108 -3109 -649 -3112 0

c  2+1 --> break 
c    (-b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧  p_649) -> break
c  in CNF:
c     b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ -p_649 ∨ break
c  in DIMACS:
 3107 -3108  3109 -649 1162 0


c  2-1 --> 1
c    (-b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧ -p_649) -> (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0)
c  in CNF:
c     b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_2
c     b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_1
c     b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨  b^{1, 650}_0
c  in DIMACS:
 3107 -3108  3109  649 -3110 0
 3107 -3108  3109  649 -3111 0
 3107 -3108  3109  649  3112 0

c  1-1 --> 0
c    (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0 ∧ -p_649) -> (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧ -b^{1, 650}_0)
c  in CNF:
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_2
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_1
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_0
c  in DIMACS:
 3107  3108 -3109  649 -3110 0
 3107  3108 -3109  649 -3111 0
 3107  3108 -3109  649 -3112 0

c  0-1 --> -1
c    (-b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧ -p_649) -> ( b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0)
c  in CNF:
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨  b^{1, 650}_2
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_1
c     b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨  b^{1, 650}_0
c  in DIMACS:
 3107  3108  3109  649  3110 0
 3107  3108  3109  649 -3111 0
 3107  3108  3109  649  3112 0

c  -1-1 --> -2
c    ( b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧  b^{1, 649}_0 ∧ -p_649) -> ( b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0)
c  in CNF:
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨  b^{1, 650}_2
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨  b^{1, 650}_1
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨  p_649 ∨ -b^{1, 650}_0
c  in DIMACS:
-3107  3108 -3109  649  3110 0
-3107  3108 -3109  649  3111 0
-3107  3108 -3109  649 -3112 0

c  -2-1 --> break 
c    ( b^{1, 649}_2 ∧  b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧ -p_649) -> break
c  in CNF:
c    -b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨  b^{1, 649}_0 ∨  p_649 ∨ break
c  in DIMACS:
-3107 -3108  3109  649 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 649}_2 ∧ -b^{1, 649}_1 ∧ -b^{1, 649}_0 ∧ true) 
c  in CNF:
c    -b^{1, 649}_2 ∨  b^{1, 649}_1 ∨  b^{1, 649}_0 ∨ false 
c  in DIMACS:
-3107  3108  3109  0

c  3 does not represent an automaton state.
c    -(-b^{1, 649}_2 ∧  b^{1, 649}_1 ∧  b^{1, 649}_0 ∧ true) 
c  in CNF:
c     b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ false 
c  in DIMACS:
 3107 -3108 -3109  0
c  -3 does not represent an automaton state.
c    -( b^{1, 649}_2 ∧  b^{1, 649}_1 ∧  b^{1, 649}_0 ∧ true) 
c  in CNF:
c    -b^{1, 649}_2 ∨ -b^{1, 649}_1 ∨ -b^{1, 649}_0 ∨ false 
c  in DIMACS:
-3107 -3108 -3109  0

c i = 650
c  -2+1 --> -1
c    ( b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧  p_650) -> ( b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0)
c  in CNF:
c    -b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨  b^{1, 651}_2
c    -b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_1
c    -b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨  b^{1, 651}_0
c  in DIMACS:
-3110 -3111  3112 -650  3113 0
-3110 -3111  3112 -650 -3114 0
-3110 -3111  3112 -650  3115 0

c  -1+1 --> 0
c    ( b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0 ∧  p_650) -> (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧ -b^{1, 651}_0)
c  in CNF:
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_2
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_1
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_0
c  in DIMACS:
-3110  3111 -3112 -650 -3113 0
-3110  3111 -3112 -650 -3114 0
-3110  3111 -3112 -650 -3115 0

c  0+1 --> 1
c    (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧  p_650) -> (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0)
c  in CNF:
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_2
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_1
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨  b^{1, 651}_0
c  in DIMACS:
 3110  3111  3112 -650 -3113 0
 3110  3111  3112 -650 -3114 0
 3110  3111  3112 -650  3115 0

c  1+1 --> 2
c    (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0 ∧  p_650) -> (-b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0)
c  in CNF:
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_2
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨  b^{1, 651}_1
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ -p_650 ∨ -b^{1, 651}_0
c  in DIMACS:
 3110  3111 -3112 -650 -3113 0
 3110  3111 -3112 -650  3114 0
 3110  3111 -3112 -650 -3115 0

c  2+1 --> break 
c    (-b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧  p_650) -> break
c  in CNF:
c     b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 3110 -3111  3112 -650 1162 0


c  2-1 --> 1
c    (-b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧ -p_650) -> (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0)
c  in CNF:
c     b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_2
c     b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_1
c     b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨  b^{1, 651}_0
c  in DIMACS:
 3110 -3111  3112  650 -3113 0
 3110 -3111  3112  650 -3114 0
 3110 -3111  3112  650  3115 0

c  1-1 --> 0
c    (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0 ∧ -p_650) -> (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧ -b^{1, 651}_0)
c  in CNF:
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_2
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_1
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_0
c  in DIMACS:
 3110  3111 -3112  650 -3113 0
 3110  3111 -3112  650 -3114 0
 3110  3111 -3112  650 -3115 0

c  0-1 --> -1
c    (-b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧ -p_650) -> ( b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0)
c  in CNF:
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨  b^{1, 651}_2
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_1
c     b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨  b^{1, 651}_0
c  in DIMACS:
 3110  3111  3112  650  3113 0
 3110  3111  3112  650 -3114 0
 3110  3111  3112  650  3115 0

c  -1-1 --> -2
c    ( b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧  b^{1, 650}_0 ∧ -p_650) -> ( b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0)
c  in CNF:
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨  b^{1, 651}_2
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨  b^{1, 651}_1
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨  p_650 ∨ -b^{1, 651}_0
c  in DIMACS:
-3110  3111 -3112  650  3113 0
-3110  3111 -3112  650  3114 0
-3110  3111 -3112  650 -3115 0

c  -2-1 --> break 
c    ( b^{1, 650}_2 ∧  b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨  b^{1, 650}_0 ∨  p_650 ∨ break
c  in DIMACS:
-3110 -3111  3112  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 650}_2 ∧ -b^{1, 650}_1 ∧ -b^{1, 650}_0 ∧ true) 
c  in CNF:
c    -b^{1, 650}_2 ∨  b^{1, 650}_1 ∨  b^{1, 650}_0 ∨ false 
c  in DIMACS:
-3110  3111  3112  0

c  3 does not represent an automaton state.
c    -(-b^{1, 650}_2 ∧  b^{1, 650}_1 ∧  b^{1, 650}_0 ∧ true) 
c  in CNF:
c     b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ false 
c  in DIMACS:
 3110 -3111 -3112  0
c  -3 does not represent an automaton state.
c    -( b^{1, 650}_2 ∧  b^{1, 650}_1 ∧  b^{1, 650}_0 ∧ true) 
c  in CNF:
c    -b^{1, 650}_2 ∨ -b^{1, 650}_1 ∨ -b^{1, 650}_0 ∨ false 
c  in DIMACS:
-3110 -3111 -3112  0

c i = 651
c  -2+1 --> -1
c    ( b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧  p_651) -> ( b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0)
c  in CNF:
c    -b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨  b^{1, 652}_2
c    -b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_1
c    -b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨  b^{1, 652}_0
c  in DIMACS:
-3113 -3114  3115 -651  3116 0
-3113 -3114  3115 -651 -3117 0
-3113 -3114  3115 -651  3118 0

c  -1+1 --> 0
c    ( b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0 ∧  p_651) -> (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧ -b^{1, 652}_0)
c  in CNF:
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_2
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_1
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_0
c  in DIMACS:
-3113  3114 -3115 -651 -3116 0
-3113  3114 -3115 -651 -3117 0
-3113  3114 -3115 -651 -3118 0

c  0+1 --> 1
c    (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧  p_651) -> (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0)
c  in CNF:
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_2
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_1
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨  b^{1, 652}_0
c  in DIMACS:
 3113  3114  3115 -651 -3116 0
 3113  3114  3115 -651 -3117 0
 3113  3114  3115 -651  3118 0

c  1+1 --> 2
c    (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0 ∧  p_651) -> (-b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0)
c  in CNF:
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_2
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨  b^{1, 652}_1
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ -p_651 ∨ -b^{1, 652}_0
c  in DIMACS:
 3113  3114 -3115 -651 -3116 0
 3113  3114 -3115 -651  3117 0
 3113  3114 -3115 -651 -3118 0

c  2+1 --> break 
c    (-b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧  p_651) -> break
c  in CNF:
c     b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 3113 -3114  3115 -651 1162 0


c  2-1 --> 1
c    (-b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧ -p_651) -> (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0)
c  in CNF:
c     b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_2
c     b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_1
c     b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨  b^{1, 652}_0
c  in DIMACS:
 3113 -3114  3115  651 -3116 0
 3113 -3114  3115  651 -3117 0
 3113 -3114  3115  651  3118 0

c  1-1 --> 0
c    (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0 ∧ -p_651) -> (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧ -b^{1, 652}_0)
c  in CNF:
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_2
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_1
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_0
c  in DIMACS:
 3113  3114 -3115  651 -3116 0
 3113  3114 -3115  651 -3117 0
 3113  3114 -3115  651 -3118 0

c  0-1 --> -1
c    (-b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧ -p_651) -> ( b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0)
c  in CNF:
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨  b^{1, 652}_2
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_1
c     b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨  b^{1, 652}_0
c  in DIMACS:
 3113  3114  3115  651  3116 0
 3113  3114  3115  651 -3117 0
 3113  3114  3115  651  3118 0

c  -1-1 --> -2
c    ( b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧  b^{1, 651}_0 ∧ -p_651) -> ( b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0)
c  in CNF:
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨  b^{1, 652}_2
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨  b^{1, 652}_1
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨  p_651 ∨ -b^{1, 652}_0
c  in DIMACS:
-3113  3114 -3115  651  3116 0
-3113  3114 -3115  651  3117 0
-3113  3114 -3115  651 -3118 0

c  -2-1 --> break 
c    ( b^{1, 651}_2 ∧  b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨  b^{1, 651}_0 ∨  p_651 ∨ break
c  in DIMACS:
-3113 -3114  3115  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 651}_2 ∧ -b^{1, 651}_1 ∧ -b^{1, 651}_0 ∧ true) 
c  in CNF:
c    -b^{1, 651}_2 ∨  b^{1, 651}_1 ∨  b^{1, 651}_0 ∨ false 
c  in DIMACS:
-3113  3114  3115  0

c  3 does not represent an automaton state.
c    -(-b^{1, 651}_2 ∧  b^{1, 651}_1 ∧  b^{1, 651}_0 ∧ true) 
c  in CNF:
c     b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ false 
c  in DIMACS:
 3113 -3114 -3115  0
c  -3 does not represent an automaton state.
c    -( b^{1, 651}_2 ∧  b^{1, 651}_1 ∧  b^{1, 651}_0 ∧ true) 
c  in CNF:
c    -b^{1, 651}_2 ∨ -b^{1, 651}_1 ∨ -b^{1, 651}_0 ∨ false 
c  in DIMACS:
-3113 -3114 -3115  0

c i = 652
c  -2+1 --> -1
c    ( b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧  p_652) -> ( b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0)
c  in CNF:
c    -b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨  b^{1, 653}_2
c    -b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_1
c    -b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨  b^{1, 653}_0
c  in DIMACS:
-3116 -3117  3118 -652  3119 0
-3116 -3117  3118 -652 -3120 0
-3116 -3117  3118 -652  3121 0

c  -1+1 --> 0
c    ( b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0 ∧  p_652) -> (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧ -b^{1, 653}_0)
c  in CNF:
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_2
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_1
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_0
c  in DIMACS:
-3116  3117 -3118 -652 -3119 0
-3116  3117 -3118 -652 -3120 0
-3116  3117 -3118 -652 -3121 0

c  0+1 --> 1
c    (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧  p_652) -> (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0)
c  in CNF:
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_2
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_1
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨  b^{1, 653}_0
c  in DIMACS:
 3116  3117  3118 -652 -3119 0
 3116  3117  3118 -652 -3120 0
 3116  3117  3118 -652  3121 0

c  1+1 --> 2
c    (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0 ∧  p_652) -> (-b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0)
c  in CNF:
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_2
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨  b^{1, 653}_1
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ -p_652 ∨ -b^{1, 653}_0
c  in DIMACS:
 3116  3117 -3118 -652 -3119 0
 3116  3117 -3118 -652  3120 0
 3116  3117 -3118 -652 -3121 0

c  2+1 --> break 
c    (-b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧  p_652) -> break
c  in CNF:
c     b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ -p_652 ∨ break
c  in DIMACS:
 3116 -3117  3118 -652 1162 0


c  2-1 --> 1
c    (-b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧ -p_652) -> (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0)
c  in CNF:
c     b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_2
c     b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_1
c     b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨  b^{1, 653}_0
c  in DIMACS:
 3116 -3117  3118  652 -3119 0
 3116 -3117  3118  652 -3120 0
 3116 -3117  3118  652  3121 0

c  1-1 --> 0
c    (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0 ∧ -p_652) -> (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧ -b^{1, 653}_0)
c  in CNF:
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_2
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_1
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_0
c  in DIMACS:
 3116  3117 -3118  652 -3119 0
 3116  3117 -3118  652 -3120 0
 3116  3117 -3118  652 -3121 0

c  0-1 --> -1
c    (-b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧ -p_652) -> ( b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0)
c  in CNF:
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨  b^{1, 653}_2
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_1
c     b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨  b^{1, 653}_0
c  in DIMACS:
 3116  3117  3118  652  3119 0
 3116  3117  3118  652 -3120 0
 3116  3117  3118  652  3121 0

c  -1-1 --> -2
c    ( b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧  b^{1, 652}_0 ∧ -p_652) -> ( b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0)
c  in CNF:
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨  b^{1, 653}_2
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨  b^{1, 653}_1
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨  p_652 ∨ -b^{1, 653}_0
c  in DIMACS:
-3116  3117 -3118  652  3119 0
-3116  3117 -3118  652  3120 0
-3116  3117 -3118  652 -3121 0

c  -2-1 --> break 
c    ( b^{1, 652}_2 ∧  b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧ -p_652) -> break
c  in CNF:
c    -b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨  b^{1, 652}_0 ∨  p_652 ∨ break
c  in DIMACS:
-3116 -3117  3118  652 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 652}_2 ∧ -b^{1, 652}_1 ∧ -b^{1, 652}_0 ∧ true) 
c  in CNF:
c    -b^{1, 652}_2 ∨  b^{1, 652}_1 ∨  b^{1, 652}_0 ∨ false 
c  in DIMACS:
-3116  3117  3118  0

c  3 does not represent an automaton state.
c    -(-b^{1, 652}_2 ∧  b^{1, 652}_1 ∧  b^{1, 652}_0 ∧ true) 
c  in CNF:
c     b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ false 
c  in DIMACS:
 3116 -3117 -3118  0
c  -3 does not represent an automaton state.
c    -( b^{1, 652}_2 ∧  b^{1, 652}_1 ∧  b^{1, 652}_0 ∧ true) 
c  in CNF:
c    -b^{1, 652}_2 ∨ -b^{1, 652}_1 ∨ -b^{1, 652}_0 ∨ false 
c  in DIMACS:
-3116 -3117 -3118  0

c i = 653
c  -2+1 --> -1
c    ( b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧  p_653) -> ( b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0)
c  in CNF:
c    -b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨  b^{1, 654}_2
c    -b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_1
c    -b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨  b^{1, 654}_0
c  in DIMACS:
-3119 -3120  3121 -653  3122 0
-3119 -3120  3121 -653 -3123 0
-3119 -3120  3121 -653  3124 0

c  -1+1 --> 0
c    ( b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0 ∧  p_653) -> (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧ -b^{1, 654}_0)
c  in CNF:
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_2
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_1
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_0
c  in DIMACS:
-3119  3120 -3121 -653 -3122 0
-3119  3120 -3121 -653 -3123 0
-3119  3120 -3121 -653 -3124 0

c  0+1 --> 1
c    (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧  p_653) -> (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0)
c  in CNF:
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_2
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_1
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨  b^{1, 654}_0
c  in DIMACS:
 3119  3120  3121 -653 -3122 0
 3119  3120  3121 -653 -3123 0
 3119  3120  3121 -653  3124 0

c  1+1 --> 2
c    (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0 ∧  p_653) -> (-b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0)
c  in CNF:
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_2
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨  b^{1, 654}_1
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ -p_653 ∨ -b^{1, 654}_0
c  in DIMACS:
 3119  3120 -3121 -653 -3122 0
 3119  3120 -3121 -653  3123 0
 3119  3120 -3121 -653 -3124 0

c  2+1 --> break 
c    (-b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧  p_653) -> break
c  in CNF:
c     b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ -p_653 ∨ break
c  in DIMACS:
 3119 -3120  3121 -653 1162 0


c  2-1 --> 1
c    (-b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧ -p_653) -> (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0)
c  in CNF:
c     b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_2
c     b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_1
c     b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨  b^{1, 654}_0
c  in DIMACS:
 3119 -3120  3121  653 -3122 0
 3119 -3120  3121  653 -3123 0
 3119 -3120  3121  653  3124 0

c  1-1 --> 0
c    (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0 ∧ -p_653) -> (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧ -b^{1, 654}_0)
c  in CNF:
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_2
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_1
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_0
c  in DIMACS:
 3119  3120 -3121  653 -3122 0
 3119  3120 -3121  653 -3123 0
 3119  3120 -3121  653 -3124 0

c  0-1 --> -1
c    (-b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧ -p_653) -> ( b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0)
c  in CNF:
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨  b^{1, 654}_2
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_1
c     b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨  b^{1, 654}_0
c  in DIMACS:
 3119  3120  3121  653  3122 0
 3119  3120  3121  653 -3123 0
 3119  3120  3121  653  3124 0

c  -1-1 --> -2
c    ( b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧  b^{1, 653}_0 ∧ -p_653) -> ( b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0)
c  in CNF:
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨  b^{1, 654}_2
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨  b^{1, 654}_1
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨  p_653 ∨ -b^{1, 654}_0
c  in DIMACS:
-3119  3120 -3121  653  3122 0
-3119  3120 -3121  653  3123 0
-3119  3120 -3121  653 -3124 0

c  -2-1 --> break 
c    ( b^{1, 653}_2 ∧  b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧ -p_653) -> break
c  in CNF:
c    -b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨  b^{1, 653}_0 ∨  p_653 ∨ break
c  in DIMACS:
-3119 -3120  3121  653 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 653}_2 ∧ -b^{1, 653}_1 ∧ -b^{1, 653}_0 ∧ true) 
c  in CNF:
c    -b^{1, 653}_2 ∨  b^{1, 653}_1 ∨  b^{1, 653}_0 ∨ false 
c  in DIMACS:
-3119  3120  3121  0

c  3 does not represent an automaton state.
c    -(-b^{1, 653}_2 ∧  b^{1, 653}_1 ∧  b^{1, 653}_0 ∧ true) 
c  in CNF:
c     b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ false 
c  in DIMACS:
 3119 -3120 -3121  0
c  -3 does not represent an automaton state.
c    -( b^{1, 653}_2 ∧  b^{1, 653}_1 ∧  b^{1, 653}_0 ∧ true) 
c  in CNF:
c    -b^{1, 653}_2 ∨ -b^{1, 653}_1 ∨ -b^{1, 653}_0 ∨ false 
c  in DIMACS:
-3119 -3120 -3121  0

c i = 654
c  -2+1 --> -1
c    ( b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧  p_654) -> ( b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0)
c  in CNF:
c    -b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨  b^{1, 655}_2
c    -b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_1
c    -b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨  b^{1, 655}_0
c  in DIMACS:
-3122 -3123  3124 -654  3125 0
-3122 -3123  3124 -654 -3126 0
-3122 -3123  3124 -654  3127 0

c  -1+1 --> 0
c    ( b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0 ∧  p_654) -> (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧ -b^{1, 655}_0)
c  in CNF:
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_2
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_1
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_0
c  in DIMACS:
-3122  3123 -3124 -654 -3125 0
-3122  3123 -3124 -654 -3126 0
-3122  3123 -3124 -654 -3127 0

c  0+1 --> 1
c    (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧  p_654) -> (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0)
c  in CNF:
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_2
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_1
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨  b^{1, 655}_0
c  in DIMACS:
 3122  3123  3124 -654 -3125 0
 3122  3123  3124 -654 -3126 0
 3122  3123  3124 -654  3127 0

c  1+1 --> 2
c    (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0 ∧  p_654) -> (-b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0)
c  in CNF:
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_2
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨  b^{1, 655}_1
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ -p_654 ∨ -b^{1, 655}_0
c  in DIMACS:
 3122  3123 -3124 -654 -3125 0
 3122  3123 -3124 -654  3126 0
 3122  3123 -3124 -654 -3127 0

c  2+1 --> break 
c    (-b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧  p_654) -> break
c  in CNF:
c     b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 3122 -3123  3124 -654 1162 0


c  2-1 --> 1
c    (-b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧ -p_654) -> (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0)
c  in CNF:
c     b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_2
c     b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_1
c     b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨  b^{1, 655}_0
c  in DIMACS:
 3122 -3123  3124  654 -3125 0
 3122 -3123  3124  654 -3126 0
 3122 -3123  3124  654  3127 0

c  1-1 --> 0
c    (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0 ∧ -p_654) -> (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧ -b^{1, 655}_0)
c  in CNF:
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_2
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_1
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_0
c  in DIMACS:
 3122  3123 -3124  654 -3125 0
 3122  3123 -3124  654 -3126 0
 3122  3123 -3124  654 -3127 0

c  0-1 --> -1
c    (-b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧ -p_654) -> ( b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0)
c  in CNF:
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨  b^{1, 655}_2
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_1
c     b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨  b^{1, 655}_0
c  in DIMACS:
 3122  3123  3124  654  3125 0
 3122  3123  3124  654 -3126 0
 3122  3123  3124  654  3127 0

c  -1-1 --> -2
c    ( b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧  b^{1, 654}_0 ∧ -p_654) -> ( b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0)
c  in CNF:
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨  b^{1, 655}_2
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨  b^{1, 655}_1
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨  p_654 ∨ -b^{1, 655}_0
c  in DIMACS:
-3122  3123 -3124  654  3125 0
-3122  3123 -3124  654  3126 0
-3122  3123 -3124  654 -3127 0

c  -2-1 --> break 
c    ( b^{1, 654}_2 ∧  b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨  b^{1, 654}_0 ∨  p_654 ∨ break
c  in DIMACS:
-3122 -3123  3124  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 654}_2 ∧ -b^{1, 654}_1 ∧ -b^{1, 654}_0 ∧ true) 
c  in CNF:
c    -b^{1, 654}_2 ∨  b^{1, 654}_1 ∨  b^{1, 654}_0 ∨ false 
c  in DIMACS:
-3122  3123  3124  0

c  3 does not represent an automaton state.
c    -(-b^{1, 654}_2 ∧  b^{1, 654}_1 ∧  b^{1, 654}_0 ∧ true) 
c  in CNF:
c     b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ false 
c  in DIMACS:
 3122 -3123 -3124  0
c  -3 does not represent an automaton state.
c    -( b^{1, 654}_2 ∧  b^{1, 654}_1 ∧  b^{1, 654}_0 ∧ true) 
c  in CNF:
c    -b^{1, 654}_2 ∨ -b^{1, 654}_1 ∨ -b^{1, 654}_0 ∨ false 
c  in DIMACS:
-3122 -3123 -3124  0

c i = 655
c  -2+1 --> -1
c    ( b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧  p_655) -> ( b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0)
c  in CNF:
c    -b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨  b^{1, 656}_2
c    -b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_1
c    -b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨  b^{1, 656}_0
c  in DIMACS:
-3125 -3126  3127 -655  3128 0
-3125 -3126  3127 -655 -3129 0
-3125 -3126  3127 -655  3130 0

c  -1+1 --> 0
c    ( b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0 ∧  p_655) -> (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧ -b^{1, 656}_0)
c  in CNF:
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_2
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_1
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_0
c  in DIMACS:
-3125  3126 -3127 -655 -3128 0
-3125  3126 -3127 -655 -3129 0
-3125  3126 -3127 -655 -3130 0

c  0+1 --> 1
c    (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧  p_655) -> (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0)
c  in CNF:
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_2
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_1
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨  b^{1, 656}_0
c  in DIMACS:
 3125  3126  3127 -655 -3128 0
 3125  3126  3127 -655 -3129 0
 3125  3126  3127 -655  3130 0

c  1+1 --> 2
c    (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0 ∧  p_655) -> (-b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0)
c  in CNF:
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_2
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨  b^{1, 656}_1
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ -p_655 ∨ -b^{1, 656}_0
c  in DIMACS:
 3125  3126 -3127 -655 -3128 0
 3125  3126 -3127 -655  3129 0
 3125  3126 -3127 -655 -3130 0

c  2+1 --> break 
c    (-b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧  p_655) -> break
c  in CNF:
c     b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ -p_655 ∨ break
c  in DIMACS:
 3125 -3126  3127 -655 1162 0


c  2-1 --> 1
c    (-b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧ -p_655) -> (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0)
c  in CNF:
c     b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_2
c     b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_1
c     b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨  b^{1, 656}_0
c  in DIMACS:
 3125 -3126  3127  655 -3128 0
 3125 -3126  3127  655 -3129 0
 3125 -3126  3127  655  3130 0

c  1-1 --> 0
c    (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0 ∧ -p_655) -> (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧ -b^{1, 656}_0)
c  in CNF:
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_2
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_1
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_0
c  in DIMACS:
 3125  3126 -3127  655 -3128 0
 3125  3126 -3127  655 -3129 0
 3125  3126 -3127  655 -3130 0

c  0-1 --> -1
c    (-b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧ -p_655) -> ( b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0)
c  in CNF:
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨  b^{1, 656}_2
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_1
c     b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨  b^{1, 656}_0
c  in DIMACS:
 3125  3126  3127  655  3128 0
 3125  3126  3127  655 -3129 0
 3125  3126  3127  655  3130 0

c  -1-1 --> -2
c    ( b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧  b^{1, 655}_0 ∧ -p_655) -> ( b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0)
c  in CNF:
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨  b^{1, 656}_2
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨  b^{1, 656}_1
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨  p_655 ∨ -b^{1, 656}_0
c  in DIMACS:
-3125  3126 -3127  655  3128 0
-3125  3126 -3127  655  3129 0
-3125  3126 -3127  655 -3130 0

c  -2-1 --> break 
c    ( b^{1, 655}_2 ∧  b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧ -p_655) -> break
c  in CNF:
c    -b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨  b^{1, 655}_0 ∨  p_655 ∨ break
c  in DIMACS:
-3125 -3126  3127  655 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 655}_2 ∧ -b^{1, 655}_1 ∧ -b^{1, 655}_0 ∧ true) 
c  in CNF:
c    -b^{1, 655}_2 ∨  b^{1, 655}_1 ∨  b^{1, 655}_0 ∨ false 
c  in DIMACS:
-3125  3126  3127  0

c  3 does not represent an automaton state.
c    -(-b^{1, 655}_2 ∧  b^{1, 655}_1 ∧  b^{1, 655}_0 ∧ true) 
c  in CNF:
c     b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ false 
c  in DIMACS:
 3125 -3126 -3127  0
c  -3 does not represent an automaton state.
c    -( b^{1, 655}_2 ∧  b^{1, 655}_1 ∧  b^{1, 655}_0 ∧ true) 
c  in CNF:
c    -b^{1, 655}_2 ∨ -b^{1, 655}_1 ∨ -b^{1, 655}_0 ∨ false 
c  in DIMACS:
-3125 -3126 -3127  0

c i = 656
c  -2+1 --> -1
c    ( b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧  p_656) -> ( b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0)
c  in CNF:
c    -b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨  b^{1, 657}_2
c    -b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_1
c    -b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨  b^{1, 657}_0
c  in DIMACS:
-3128 -3129  3130 -656  3131 0
-3128 -3129  3130 -656 -3132 0
-3128 -3129  3130 -656  3133 0

c  -1+1 --> 0
c    ( b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0 ∧  p_656) -> (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧ -b^{1, 657}_0)
c  in CNF:
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_2
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_1
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_0
c  in DIMACS:
-3128  3129 -3130 -656 -3131 0
-3128  3129 -3130 -656 -3132 0
-3128  3129 -3130 -656 -3133 0

c  0+1 --> 1
c    (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧  p_656) -> (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0)
c  in CNF:
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_2
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_1
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨  b^{1, 657}_0
c  in DIMACS:
 3128  3129  3130 -656 -3131 0
 3128  3129  3130 -656 -3132 0
 3128  3129  3130 -656  3133 0

c  1+1 --> 2
c    (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0 ∧  p_656) -> (-b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0)
c  in CNF:
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_2
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨  b^{1, 657}_1
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ -p_656 ∨ -b^{1, 657}_0
c  in DIMACS:
 3128  3129 -3130 -656 -3131 0
 3128  3129 -3130 -656  3132 0
 3128  3129 -3130 -656 -3133 0

c  2+1 --> break 
c    (-b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧  p_656) -> break
c  in CNF:
c     b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 3128 -3129  3130 -656 1162 0


c  2-1 --> 1
c    (-b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧ -p_656) -> (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0)
c  in CNF:
c     b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_2
c     b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_1
c     b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨  b^{1, 657}_0
c  in DIMACS:
 3128 -3129  3130  656 -3131 0
 3128 -3129  3130  656 -3132 0
 3128 -3129  3130  656  3133 0

c  1-1 --> 0
c    (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0 ∧ -p_656) -> (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧ -b^{1, 657}_0)
c  in CNF:
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_2
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_1
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_0
c  in DIMACS:
 3128  3129 -3130  656 -3131 0
 3128  3129 -3130  656 -3132 0
 3128  3129 -3130  656 -3133 0

c  0-1 --> -1
c    (-b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧ -p_656) -> ( b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0)
c  in CNF:
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨  b^{1, 657}_2
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_1
c     b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨  b^{1, 657}_0
c  in DIMACS:
 3128  3129  3130  656  3131 0
 3128  3129  3130  656 -3132 0
 3128  3129  3130  656  3133 0

c  -1-1 --> -2
c    ( b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧  b^{1, 656}_0 ∧ -p_656) -> ( b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0)
c  in CNF:
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨  b^{1, 657}_2
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨  b^{1, 657}_1
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨  p_656 ∨ -b^{1, 657}_0
c  in DIMACS:
-3128  3129 -3130  656  3131 0
-3128  3129 -3130  656  3132 0
-3128  3129 -3130  656 -3133 0

c  -2-1 --> break 
c    ( b^{1, 656}_2 ∧  b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨  b^{1, 656}_0 ∨  p_656 ∨ break
c  in DIMACS:
-3128 -3129  3130  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 656}_2 ∧ -b^{1, 656}_1 ∧ -b^{1, 656}_0 ∧ true) 
c  in CNF:
c    -b^{1, 656}_2 ∨  b^{1, 656}_1 ∨  b^{1, 656}_0 ∨ false 
c  in DIMACS:
-3128  3129  3130  0

c  3 does not represent an automaton state.
c    -(-b^{1, 656}_2 ∧  b^{1, 656}_1 ∧  b^{1, 656}_0 ∧ true) 
c  in CNF:
c     b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ false 
c  in DIMACS:
 3128 -3129 -3130  0
c  -3 does not represent an automaton state.
c    -( b^{1, 656}_2 ∧  b^{1, 656}_1 ∧  b^{1, 656}_0 ∧ true) 
c  in CNF:
c    -b^{1, 656}_2 ∨ -b^{1, 656}_1 ∨ -b^{1, 656}_0 ∨ false 
c  in DIMACS:
-3128 -3129 -3130  0

c i = 657
c  -2+1 --> -1
c    ( b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧  p_657) -> ( b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0)
c  in CNF:
c    -b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨  b^{1, 658}_2
c    -b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_1
c    -b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨  b^{1, 658}_0
c  in DIMACS:
-3131 -3132  3133 -657  3134 0
-3131 -3132  3133 -657 -3135 0
-3131 -3132  3133 -657  3136 0

c  -1+1 --> 0
c    ( b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0 ∧  p_657) -> (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧ -b^{1, 658}_0)
c  in CNF:
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_2
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_1
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_0
c  in DIMACS:
-3131  3132 -3133 -657 -3134 0
-3131  3132 -3133 -657 -3135 0
-3131  3132 -3133 -657 -3136 0

c  0+1 --> 1
c    (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧  p_657) -> (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0)
c  in CNF:
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_2
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_1
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨  b^{1, 658}_0
c  in DIMACS:
 3131  3132  3133 -657 -3134 0
 3131  3132  3133 -657 -3135 0
 3131  3132  3133 -657  3136 0

c  1+1 --> 2
c    (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0 ∧  p_657) -> (-b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0)
c  in CNF:
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_2
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨  b^{1, 658}_1
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ -p_657 ∨ -b^{1, 658}_0
c  in DIMACS:
 3131  3132 -3133 -657 -3134 0
 3131  3132 -3133 -657  3135 0
 3131  3132 -3133 -657 -3136 0

c  2+1 --> break 
c    (-b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧  p_657) -> break
c  in CNF:
c     b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ -p_657 ∨ break
c  in DIMACS:
 3131 -3132  3133 -657 1162 0


c  2-1 --> 1
c    (-b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧ -p_657) -> (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0)
c  in CNF:
c     b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_2
c     b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_1
c     b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨  b^{1, 658}_0
c  in DIMACS:
 3131 -3132  3133  657 -3134 0
 3131 -3132  3133  657 -3135 0
 3131 -3132  3133  657  3136 0

c  1-1 --> 0
c    (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0 ∧ -p_657) -> (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧ -b^{1, 658}_0)
c  in CNF:
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_2
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_1
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_0
c  in DIMACS:
 3131  3132 -3133  657 -3134 0
 3131  3132 -3133  657 -3135 0
 3131  3132 -3133  657 -3136 0

c  0-1 --> -1
c    (-b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧ -p_657) -> ( b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0)
c  in CNF:
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨  b^{1, 658}_2
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_1
c     b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨  b^{1, 658}_0
c  in DIMACS:
 3131  3132  3133  657  3134 0
 3131  3132  3133  657 -3135 0
 3131  3132  3133  657  3136 0

c  -1-1 --> -2
c    ( b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧  b^{1, 657}_0 ∧ -p_657) -> ( b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0)
c  in CNF:
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨  b^{1, 658}_2
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨  b^{1, 658}_1
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨  p_657 ∨ -b^{1, 658}_0
c  in DIMACS:
-3131  3132 -3133  657  3134 0
-3131  3132 -3133  657  3135 0
-3131  3132 -3133  657 -3136 0

c  -2-1 --> break 
c    ( b^{1, 657}_2 ∧  b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧ -p_657) -> break
c  in CNF:
c    -b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨  b^{1, 657}_0 ∨  p_657 ∨ break
c  in DIMACS:
-3131 -3132  3133  657 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 657}_2 ∧ -b^{1, 657}_1 ∧ -b^{1, 657}_0 ∧ true) 
c  in CNF:
c    -b^{1, 657}_2 ∨  b^{1, 657}_1 ∨  b^{1, 657}_0 ∨ false 
c  in DIMACS:
-3131  3132  3133  0

c  3 does not represent an automaton state.
c    -(-b^{1, 657}_2 ∧  b^{1, 657}_1 ∧  b^{1, 657}_0 ∧ true) 
c  in CNF:
c     b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ false 
c  in DIMACS:
 3131 -3132 -3133  0
c  -3 does not represent an automaton state.
c    -( b^{1, 657}_2 ∧  b^{1, 657}_1 ∧  b^{1, 657}_0 ∧ true) 
c  in CNF:
c    -b^{1, 657}_2 ∨ -b^{1, 657}_1 ∨ -b^{1, 657}_0 ∨ false 
c  in DIMACS:
-3131 -3132 -3133  0

c i = 658
c  -2+1 --> -1
c    ( b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧  p_658) -> ( b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0)
c  in CNF:
c    -b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨  b^{1, 659}_2
c    -b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_1
c    -b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨  b^{1, 659}_0
c  in DIMACS:
-3134 -3135  3136 -658  3137 0
-3134 -3135  3136 -658 -3138 0
-3134 -3135  3136 -658  3139 0

c  -1+1 --> 0
c    ( b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0 ∧  p_658) -> (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧ -b^{1, 659}_0)
c  in CNF:
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_2
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_1
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_0
c  in DIMACS:
-3134  3135 -3136 -658 -3137 0
-3134  3135 -3136 -658 -3138 0
-3134  3135 -3136 -658 -3139 0

c  0+1 --> 1
c    (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧  p_658) -> (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0)
c  in CNF:
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_2
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_1
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨  b^{1, 659}_0
c  in DIMACS:
 3134  3135  3136 -658 -3137 0
 3134  3135  3136 -658 -3138 0
 3134  3135  3136 -658  3139 0

c  1+1 --> 2
c    (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0 ∧  p_658) -> (-b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0)
c  in CNF:
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_2
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨  b^{1, 659}_1
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ -p_658 ∨ -b^{1, 659}_0
c  in DIMACS:
 3134  3135 -3136 -658 -3137 0
 3134  3135 -3136 -658  3138 0
 3134  3135 -3136 -658 -3139 0

c  2+1 --> break 
c    (-b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧  p_658) -> break
c  in CNF:
c     b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 3134 -3135  3136 -658 1162 0


c  2-1 --> 1
c    (-b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧ -p_658) -> (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0)
c  in CNF:
c     b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_2
c     b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_1
c     b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨  b^{1, 659}_0
c  in DIMACS:
 3134 -3135  3136  658 -3137 0
 3134 -3135  3136  658 -3138 0
 3134 -3135  3136  658  3139 0

c  1-1 --> 0
c    (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0 ∧ -p_658) -> (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧ -b^{1, 659}_0)
c  in CNF:
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_2
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_1
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_0
c  in DIMACS:
 3134  3135 -3136  658 -3137 0
 3134  3135 -3136  658 -3138 0
 3134  3135 -3136  658 -3139 0

c  0-1 --> -1
c    (-b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧ -p_658) -> ( b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0)
c  in CNF:
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨  b^{1, 659}_2
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_1
c     b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨  b^{1, 659}_0
c  in DIMACS:
 3134  3135  3136  658  3137 0
 3134  3135  3136  658 -3138 0
 3134  3135  3136  658  3139 0

c  -1-1 --> -2
c    ( b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧  b^{1, 658}_0 ∧ -p_658) -> ( b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0)
c  in CNF:
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨  b^{1, 659}_2
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨  b^{1, 659}_1
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨  p_658 ∨ -b^{1, 659}_0
c  in DIMACS:
-3134  3135 -3136  658  3137 0
-3134  3135 -3136  658  3138 0
-3134  3135 -3136  658 -3139 0

c  -2-1 --> break 
c    ( b^{1, 658}_2 ∧  b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨  b^{1, 658}_0 ∨  p_658 ∨ break
c  in DIMACS:
-3134 -3135  3136  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 658}_2 ∧ -b^{1, 658}_1 ∧ -b^{1, 658}_0 ∧ true) 
c  in CNF:
c    -b^{1, 658}_2 ∨  b^{1, 658}_1 ∨  b^{1, 658}_0 ∨ false 
c  in DIMACS:
-3134  3135  3136  0

c  3 does not represent an automaton state.
c    -(-b^{1, 658}_2 ∧  b^{1, 658}_1 ∧  b^{1, 658}_0 ∧ true) 
c  in CNF:
c     b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ false 
c  in DIMACS:
 3134 -3135 -3136  0
c  -3 does not represent an automaton state.
c    -( b^{1, 658}_2 ∧  b^{1, 658}_1 ∧  b^{1, 658}_0 ∧ true) 
c  in CNF:
c    -b^{1, 658}_2 ∨ -b^{1, 658}_1 ∨ -b^{1, 658}_0 ∨ false 
c  in DIMACS:
-3134 -3135 -3136  0

c i = 659
c  -2+1 --> -1
c    ( b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧  p_659) -> ( b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0)
c  in CNF:
c    -b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨  b^{1, 660}_2
c    -b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_1
c    -b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨  b^{1, 660}_0
c  in DIMACS:
-3137 -3138  3139 -659  3140 0
-3137 -3138  3139 -659 -3141 0
-3137 -3138  3139 -659  3142 0

c  -1+1 --> 0
c    ( b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0 ∧  p_659) -> (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧ -b^{1, 660}_0)
c  in CNF:
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_2
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_1
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_0
c  in DIMACS:
-3137  3138 -3139 -659 -3140 0
-3137  3138 -3139 -659 -3141 0
-3137  3138 -3139 -659 -3142 0

c  0+1 --> 1
c    (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧  p_659) -> (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0)
c  in CNF:
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_2
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_1
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨  b^{1, 660}_0
c  in DIMACS:
 3137  3138  3139 -659 -3140 0
 3137  3138  3139 -659 -3141 0
 3137  3138  3139 -659  3142 0

c  1+1 --> 2
c    (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0 ∧  p_659) -> (-b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0)
c  in CNF:
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_2
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨  b^{1, 660}_1
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ -p_659 ∨ -b^{1, 660}_0
c  in DIMACS:
 3137  3138 -3139 -659 -3140 0
 3137  3138 -3139 -659  3141 0
 3137  3138 -3139 -659 -3142 0

c  2+1 --> break 
c    (-b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧  p_659) -> break
c  in CNF:
c     b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ -p_659 ∨ break
c  in DIMACS:
 3137 -3138  3139 -659 1162 0


c  2-1 --> 1
c    (-b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧ -p_659) -> (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0)
c  in CNF:
c     b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_2
c     b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_1
c     b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨  b^{1, 660}_0
c  in DIMACS:
 3137 -3138  3139  659 -3140 0
 3137 -3138  3139  659 -3141 0
 3137 -3138  3139  659  3142 0

c  1-1 --> 0
c    (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0 ∧ -p_659) -> (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧ -b^{1, 660}_0)
c  in CNF:
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_2
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_1
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_0
c  in DIMACS:
 3137  3138 -3139  659 -3140 0
 3137  3138 -3139  659 -3141 0
 3137  3138 -3139  659 -3142 0

c  0-1 --> -1
c    (-b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧ -p_659) -> ( b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0)
c  in CNF:
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨  b^{1, 660}_2
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_1
c     b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨  b^{1, 660}_0
c  in DIMACS:
 3137  3138  3139  659  3140 0
 3137  3138  3139  659 -3141 0
 3137  3138  3139  659  3142 0

c  -1-1 --> -2
c    ( b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧  b^{1, 659}_0 ∧ -p_659) -> ( b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0)
c  in CNF:
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨  b^{1, 660}_2
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨  b^{1, 660}_1
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨  p_659 ∨ -b^{1, 660}_0
c  in DIMACS:
-3137  3138 -3139  659  3140 0
-3137  3138 -3139  659  3141 0
-3137  3138 -3139  659 -3142 0

c  -2-1 --> break 
c    ( b^{1, 659}_2 ∧  b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧ -p_659) -> break
c  in CNF:
c    -b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨  b^{1, 659}_0 ∨  p_659 ∨ break
c  in DIMACS:
-3137 -3138  3139  659 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 659}_2 ∧ -b^{1, 659}_1 ∧ -b^{1, 659}_0 ∧ true) 
c  in CNF:
c    -b^{1, 659}_2 ∨  b^{1, 659}_1 ∨  b^{1, 659}_0 ∨ false 
c  in DIMACS:
-3137  3138  3139  0

c  3 does not represent an automaton state.
c    -(-b^{1, 659}_2 ∧  b^{1, 659}_1 ∧  b^{1, 659}_0 ∧ true) 
c  in CNF:
c     b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ false 
c  in DIMACS:
 3137 -3138 -3139  0
c  -3 does not represent an automaton state.
c    -( b^{1, 659}_2 ∧  b^{1, 659}_1 ∧  b^{1, 659}_0 ∧ true) 
c  in CNF:
c    -b^{1, 659}_2 ∨ -b^{1, 659}_1 ∨ -b^{1, 659}_0 ∨ false 
c  in DIMACS:
-3137 -3138 -3139  0

c i = 660
c  -2+1 --> -1
c    ( b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧  p_660) -> ( b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0)
c  in CNF:
c    -b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨  b^{1, 661}_2
c    -b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_1
c    -b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨  b^{1, 661}_0
c  in DIMACS:
-3140 -3141  3142 -660  3143 0
-3140 -3141  3142 -660 -3144 0
-3140 -3141  3142 -660  3145 0

c  -1+1 --> 0
c    ( b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0 ∧  p_660) -> (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧ -b^{1, 661}_0)
c  in CNF:
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_2
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_1
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_0
c  in DIMACS:
-3140  3141 -3142 -660 -3143 0
-3140  3141 -3142 -660 -3144 0
-3140  3141 -3142 -660 -3145 0

c  0+1 --> 1
c    (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧  p_660) -> (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0)
c  in CNF:
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_2
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_1
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨  b^{1, 661}_0
c  in DIMACS:
 3140  3141  3142 -660 -3143 0
 3140  3141  3142 -660 -3144 0
 3140  3141  3142 -660  3145 0

c  1+1 --> 2
c    (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0 ∧  p_660) -> (-b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0)
c  in CNF:
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_2
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨  b^{1, 661}_1
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ -p_660 ∨ -b^{1, 661}_0
c  in DIMACS:
 3140  3141 -3142 -660 -3143 0
 3140  3141 -3142 -660  3144 0
 3140  3141 -3142 -660 -3145 0

c  2+1 --> break 
c    (-b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧  p_660) -> break
c  in CNF:
c     b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 3140 -3141  3142 -660 1162 0


c  2-1 --> 1
c    (-b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧ -p_660) -> (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0)
c  in CNF:
c     b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_2
c     b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_1
c     b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨  b^{1, 661}_0
c  in DIMACS:
 3140 -3141  3142  660 -3143 0
 3140 -3141  3142  660 -3144 0
 3140 -3141  3142  660  3145 0

c  1-1 --> 0
c    (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0 ∧ -p_660) -> (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧ -b^{1, 661}_0)
c  in CNF:
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_2
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_1
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_0
c  in DIMACS:
 3140  3141 -3142  660 -3143 0
 3140  3141 -3142  660 -3144 0
 3140  3141 -3142  660 -3145 0

c  0-1 --> -1
c    (-b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧ -p_660) -> ( b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0)
c  in CNF:
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨  b^{1, 661}_2
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_1
c     b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨  b^{1, 661}_0
c  in DIMACS:
 3140  3141  3142  660  3143 0
 3140  3141  3142  660 -3144 0
 3140  3141  3142  660  3145 0

c  -1-1 --> -2
c    ( b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧  b^{1, 660}_0 ∧ -p_660) -> ( b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0)
c  in CNF:
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨  b^{1, 661}_2
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨  b^{1, 661}_1
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨  p_660 ∨ -b^{1, 661}_0
c  in DIMACS:
-3140  3141 -3142  660  3143 0
-3140  3141 -3142  660  3144 0
-3140  3141 -3142  660 -3145 0

c  -2-1 --> break 
c    ( b^{1, 660}_2 ∧  b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨  b^{1, 660}_0 ∨  p_660 ∨ break
c  in DIMACS:
-3140 -3141  3142  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 660}_2 ∧ -b^{1, 660}_1 ∧ -b^{1, 660}_0 ∧ true) 
c  in CNF:
c    -b^{1, 660}_2 ∨  b^{1, 660}_1 ∨  b^{1, 660}_0 ∨ false 
c  in DIMACS:
-3140  3141  3142  0

c  3 does not represent an automaton state.
c    -(-b^{1, 660}_2 ∧  b^{1, 660}_1 ∧  b^{1, 660}_0 ∧ true) 
c  in CNF:
c     b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ false 
c  in DIMACS:
 3140 -3141 -3142  0
c  -3 does not represent an automaton state.
c    -( b^{1, 660}_2 ∧  b^{1, 660}_1 ∧  b^{1, 660}_0 ∧ true) 
c  in CNF:
c    -b^{1, 660}_2 ∨ -b^{1, 660}_1 ∨ -b^{1, 660}_0 ∨ false 
c  in DIMACS:
-3140 -3141 -3142  0

c i = 661
c  -2+1 --> -1
c    ( b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧  p_661) -> ( b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0)
c  in CNF:
c    -b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨  b^{1, 662}_2
c    -b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_1
c    -b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨  b^{1, 662}_0
c  in DIMACS:
-3143 -3144  3145 -661  3146 0
-3143 -3144  3145 -661 -3147 0
-3143 -3144  3145 -661  3148 0

c  -1+1 --> 0
c    ( b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0 ∧  p_661) -> (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧ -b^{1, 662}_0)
c  in CNF:
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_2
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_1
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_0
c  in DIMACS:
-3143  3144 -3145 -661 -3146 0
-3143  3144 -3145 -661 -3147 0
-3143  3144 -3145 -661 -3148 0

c  0+1 --> 1
c    (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧  p_661) -> (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0)
c  in CNF:
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_2
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_1
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨  b^{1, 662}_0
c  in DIMACS:
 3143  3144  3145 -661 -3146 0
 3143  3144  3145 -661 -3147 0
 3143  3144  3145 -661  3148 0

c  1+1 --> 2
c    (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0 ∧  p_661) -> (-b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0)
c  in CNF:
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_2
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨  b^{1, 662}_1
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ -p_661 ∨ -b^{1, 662}_0
c  in DIMACS:
 3143  3144 -3145 -661 -3146 0
 3143  3144 -3145 -661  3147 0
 3143  3144 -3145 -661 -3148 0

c  2+1 --> break 
c    (-b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧  p_661) -> break
c  in CNF:
c     b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ -p_661 ∨ break
c  in DIMACS:
 3143 -3144  3145 -661 1162 0


c  2-1 --> 1
c    (-b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧ -p_661) -> (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0)
c  in CNF:
c     b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_2
c     b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_1
c     b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨  b^{1, 662}_0
c  in DIMACS:
 3143 -3144  3145  661 -3146 0
 3143 -3144  3145  661 -3147 0
 3143 -3144  3145  661  3148 0

c  1-1 --> 0
c    (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0 ∧ -p_661) -> (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧ -b^{1, 662}_0)
c  in CNF:
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_2
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_1
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_0
c  in DIMACS:
 3143  3144 -3145  661 -3146 0
 3143  3144 -3145  661 -3147 0
 3143  3144 -3145  661 -3148 0

c  0-1 --> -1
c    (-b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧ -p_661) -> ( b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0)
c  in CNF:
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨  b^{1, 662}_2
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_1
c     b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨  b^{1, 662}_0
c  in DIMACS:
 3143  3144  3145  661  3146 0
 3143  3144  3145  661 -3147 0
 3143  3144  3145  661  3148 0

c  -1-1 --> -2
c    ( b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧  b^{1, 661}_0 ∧ -p_661) -> ( b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0)
c  in CNF:
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨  b^{1, 662}_2
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨  b^{1, 662}_1
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨  p_661 ∨ -b^{1, 662}_0
c  in DIMACS:
-3143  3144 -3145  661  3146 0
-3143  3144 -3145  661  3147 0
-3143  3144 -3145  661 -3148 0

c  -2-1 --> break 
c    ( b^{1, 661}_2 ∧  b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧ -p_661) -> break
c  in CNF:
c    -b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨  b^{1, 661}_0 ∨  p_661 ∨ break
c  in DIMACS:
-3143 -3144  3145  661 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 661}_2 ∧ -b^{1, 661}_1 ∧ -b^{1, 661}_0 ∧ true) 
c  in CNF:
c    -b^{1, 661}_2 ∨  b^{1, 661}_1 ∨  b^{1, 661}_0 ∨ false 
c  in DIMACS:
-3143  3144  3145  0

c  3 does not represent an automaton state.
c    -(-b^{1, 661}_2 ∧  b^{1, 661}_1 ∧  b^{1, 661}_0 ∧ true) 
c  in CNF:
c     b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ false 
c  in DIMACS:
 3143 -3144 -3145  0
c  -3 does not represent an automaton state.
c    -( b^{1, 661}_2 ∧  b^{1, 661}_1 ∧  b^{1, 661}_0 ∧ true) 
c  in CNF:
c    -b^{1, 661}_2 ∨ -b^{1, 661}_1 ∨ -b^{1, 661}_0 ∨ false 
c  in DIMACS:
-3143 -3144 -3145  0

c i = 662
c  -2+1 --> -1
c    ( b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧  p_662) -> ( b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0)
c  in CNF:
c    -b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨  b^{1, 663}_2
c    -b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_1
c    -b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨  b^{1, 663}_0
c  in DIMACS:
-3146 -3147  3148 -662  3149 0
-3146 -3147  3148 -662 -3150 0
-3146 -3147  3148 -662  3151 0

c  -1+1 --> 0
c    ( b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0 ∧  p_662) -> (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧ -b^{1, 663}_0)
c  in CNF:
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_2
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_1
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_0
c  in DIMACS:
-3146  3147 -3148 -662 -3149 0
-3146  3147 -3148 -662 -3150 0
-3146  3147 -3148 -662 -3151 0

c  0+1 --> 1
c    (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧  p_662) -> (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0)
c  in CNF:
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_2
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_1
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨  b^{1, 663}_0
c  in DIMACS:
 3146  3147  3148 -662 -3149 0
 3146  3147  3148 -662 -3150 0
 3146  3147  3148 -662  3151 0

c  1+1 --> 2
c    (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0 ∧  p_662) -> (-b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0)
c  in CNF:
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_2
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨  b^{1, 663}_1
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ -p_662 ∨ -b^{1, 663}_0
c  in DIMACS:
 3146  3147 -3148 -662 -3149 0
 3146  3147 -3148 -662  3150 0
 3146  3147 -3148 -662 -3151 0

c  2+1 --> break 
c    (-b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧  p_662) -> break
c  in CNF:
c     b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ -p_662 ∨ break
c  in DIMACS:
 3146 -3147  3148 -662 1162 0


c  2-1 --> 1
c    (-b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧ -p_662) -> (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0)
c  in CNF:
c     b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_2
c     b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_1
c     b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨  b^{1, 663}_0
c  in DIMACS:
 3146 -3147  3148  662 -3149 0
 3146 -3147  3148  662 -3150 0
 3146 -3147  3148  662  3151 0

c  1-1 --> 0
c    (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0 ∧ -p_662) -> (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧ -b^{1, 663}_0)
c  in CNF:
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_2
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_1
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_0
c  in DIMACS:
 3146  3147 -3148  662 -3149 0
 3146  3147 -3148  662 -3150 0
 3146  3147 -3148  662 -3151 0

c  0-1 --> -1
c    (-b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧ -p_662) -> ( b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0)
c  in CNF:
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨  b^{1, 663}_2
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_1
c     b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨  b^{1, 663}_0
c  in DIMACS:
 3146  3147  3148  662  3149 0
 3146  3147  3148  662 -3150 0
 3146  3147  3148  662  3151 0

c  -1-1 --> -2
c    ( b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧  b^{1, 662}_0 ∧ -p_662) -> ( b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0)
c  in CNF:
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨  b^{1, 663}_2
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨  b^{1, 663}_1
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨  p_662 ∨ -b^{1, 663}_0
c  in DIMACS:
-3146  3147 -3148  662  3149 0
-3146  3147 -3148  662  3150 0
-3146  3147 -3148  662 -3151 0

c  -2-1 --> break 
c    ( b^{1, 662}_2 ∧  b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧ -p_662) -> break
c  in CNF:
c    -b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨  b^{1, 662}_0 ∨  p_662 ∨ break
c  in DIMACS:
-3146 -3147  3148  662 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 662}_2 ∧ -b^{1, 662}_1 ∧ -b^{1, 662}_0 ∧ true) 
c  in CNF:
c    -b^{1, 662}_2 ∨  b^{1, 662}_1 ∨  b^{1, 662}_0 ∨ false 
c  in DIMACS:
-3146  3147  3148  0

c  3 does not represent an automaton state.
c    -(-b^{1, 662}_2 ∧  b^{1, 662}_1 ∧  b^{1, 662}_0 ∧ true) 
c  in CNF:
c     b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ false 
c  in DIMACS:
 3146 -3147 -3148  0
c  -3 does not represent an automaton state.
c    -( b^{1, 662}_2 ∧  b^{1, 662}_1 ∧  b^{1, 662}_0 ∧ true) 
c  in CNF:
c    -b^{1, 662}_2 ∨ -b^{1, 662}_1 ∨ -b^{1, 662}_0 ∨ false 
c  in DIMACS:
-3146 -3147 -3148  0

c i = 663
c  -2+1 --> -1
c    ( b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧  p_663) -> ( b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0)
c  in CNF:
c    -b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨  b^{1, 664}_2
c    -b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_1
c    -b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨  b^{1, 664}_0
c  in DIMACS:
-3149 -3150  3151 -663  3152 0
-3149 -3150  3151 -663 -3153 0
-3149 -3150  3151 -663  3154 0

c  -1+1 --> 0
c    ( b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0 ∧  p_663) -> (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧ -b^{1, 664}_0)
c  in CNF:
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_2
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_1
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_0
c  in DIMACS:
-3149  3150 -3151 -663 -3152 0
-3149  3150 -3151 -663 -3153 0
-3149  3150 -3151 -663 -3154 0

c  0+1 --> 1
c    (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧  p_663) -> (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0)
c  in CNF:
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_2
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_1
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨  b^{1, 664}_0
c  in DIMACS:
 3149  3150  3151 -663 -3152 0
 3149  3150  3151 -663 -3153 0
 3149  3150  3151 -663  3154 0

c  1+1 --> 2
c    (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0 ∧  p_663) -> (-b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0)
c  in CNF:
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_2
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨  b^{1, 664}_1
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ -p_663 ∨ -b^{1, 664}_0
c  in DIMACS:
 3149  3150 -3151 -663 -3152 0
 3149  3150 -3151 -663  3153 0
 3149  3150 -3151 -663 -3154 0

c  2+1 --> break 
c    (-b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧  p_663) -> break
c  in CNF:
c     b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 3149 -3150  3151 -663 1162 0


c  2-1 --> 1
c    (-b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧ -p_663) -> (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0)
c  in CNF:
c     b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_2
c     b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_1
c     b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨  b^{1, 664}_0
c  in DIMACS:
 3149 -3150  3151  663 -3152 0
 3149 -3150  3151  663 -3153 0
 3149 -3150  3151  663  3154 0

c  1-1 --> 0
c    (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0 ∧ -p_663) -> (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧ -b^{1, 664}_0)
c  in CNF:
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_2
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_1
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_0
c  in DIMACS:
 3149  3150 -3151  663 -3152 0
 3149  3150 -3151  663 -3153 0
 3149  3150 -3151  663 -3154 0

c  0-1 --> -1
c    (-b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧ -p_663) -> ( b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0)
c  in CNF:
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨  b^{1, 664}_2
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_1
c     b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨  b^{1, 664}_0
c  in DIMACS:
 3149  3150  3151  663  3152 0
 3149  3150  3151  663 -3153 0
 3149  3150  3151  663  3154 0

c  -1-1 --> -2
c    ( b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧  b^{1, 663}_0 ∧ -p_663) -> ( b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0)
c  in CNF:
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨  b^{1, 664}_2
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨  b^{1, 664}_1
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨  p_663 ∨ -b^{1, 664}_0
c  in DIMACS:
-3149  3150 -3151  663  3152 0
-3149  3150 -3151  663  3153 0
-3149  3150 -3151  663 -3154 0

c  -2-1 --> break 
c    ( b^{1, 663}_2 ∧  b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨  b^{1, 663}_0 ∨  p_663 ∨ break
c  in DIMACS:
-3149 -3150  3151  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 663}_2 ∧ -b^{1, 663}_1 ∧ -b^{1, 663}_0 ∧ true) 
c  in CNF:
c    -b^{1, 663}_2 ∨  b^{1, 663}_1 ∨  b^{1, 663}_0 ∨ false 
c  in DIMACS:
-3149  3150  3151  0

c  3 does not represent an automaton state.
c    -(-b^{1, 663}_2 ∧  b^{1, 663}_1 ∧  b^{1, 663}_0 ∧ true) 
c  in CNF:
c     b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ false 
c  in DIMACS:
 3149 -3150 -3151  0
c  -3 does not represent an automaton state.
c    -( b^{1, 663}_2 ∧  b^{1, 663}_1 ∧  b^{1, 663}_0 ∧ true) 
c  in CNF:
c    -b^{1, 663}_2 ∨ -b^{1, 663}_1 ∨ -b^{1, 663}_0 ∨ false 
c  in DIMACS:
-3149 -3150 -3151  0

c i = 664
c  -2+1 --> -1
c    ( b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧  p_664) -> ( b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0)
c  in CNF:
c    -b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨  b^{1, 665}_2
c    -b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_1
c    -b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨  b^{1, 665}_0
c  in DIMACS:
-3152 -3153  3154 -664  3155 0
-3152 -3153  3154 -664 -3156 0
-3152 -3153  3154 -664  3157 0

c  -1+1 --> 0
c    ( b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0 ∧  p_664) -> (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧ -b^{1, 665}_0)
c  in CNF:
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_2
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_1
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_0
c  in DIMACS:
-3152  3153 -3154 -664 -3155 0
-3152  3153 -3154 -664 -3156 0
-3152  3153 -3154 -664 -3157 0

c  0+1 --> 1
c    (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧  p_664) -> (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0)
c  in CNF:
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_2
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_1
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨  b^{1, 665}_0
c  in DIMACS:
 3152  3153  3154 -664 -3155 0
 3152  3153  3154 -664 -3156 0
 3152  3153  3154 -664  3157 0

c  1+1 --> 2
c    (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0 ∧  p_664) -> (-b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0)
c  in CNF:
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_2
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨  b^{1, 665}_1
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ -p_664 ∨ -b^{1, 665}_0
c  in DIMACS:
 3152  3153 -3154 -664 -3155 0
 3152  3153 -3154 -664  3156 0
 3152  3153 -3154 -664 -3157 0

c  2+1 --> break 
c    (-b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧  p_664) -> break
c  in CNF:
c     b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 3152 -3153  3154 -664 1162 0


c  2-1 --> 1
c    (-b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧ -p_664) -> (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0)
c  in CNF:
c     b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_2
c     b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_1
c     b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨  b^{1, 665}_0
c  in DIMACS:
 3152 -3153  3154  664 -3155 0
 3152 -3153  3154  664 -3156 0
 3152 -3153  3154  664  3157 0

c  1-1 --> 0
c    (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0 ∧ -p_664) -> (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧ -b^{1, 665}_0)
c  in CNF:
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_2
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_1
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_0
c  in DIMACS:
 3152  3153 -3154  664 -3155 0
 3152  3153 -3154  664 -3156 0
 3152  3153 -3154  664 -3157 0

c  0-1 --> -1
c    (-b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧ -p_664) -> ( b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0)
c  in CNF:
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨  b^{1, 665}_2
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_1
c     b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨  b^{1, 665}_0
c  in DIMACS:
 3152  3153  3154  664  3155 0
 3152  3153  3154  664 -3156 0
 3152  3153  3154  664  3157 0

c  -1-1 --> -2
c    ( b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧  b^{1, 664}_0 ∧ -p_664) -> ( b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0)
c  in CNF:
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨  b^{1, 665}_2
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨  b^{1, 665}_1
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨  p_664 ∨ -b^{1, 665}_0
c  in DIMACS:
-3152  3153 -3154  664  3155 0
-3152  3153 -3154  664  3156 0
-3152  3153 -3154  664 -3157 0

c  -2-1 --> break 
c    ( b^{1, 664}_2 ∧  b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨  b^{1, 664}_0 ∨  p_664 ∨ break
c  in DIMACS:
-3152 -3153  3154  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 664}_2 ∧ -b^{1, 664}_1 ∧ -b^{1, 664}_0 ∧ true) 
c  in CNF:
c    -b^{1, 664}_2 ∨  b^{1, 664}_1 ∨  b^{1, 664}_0 ∨ false 
c  in DIMACS:
-3152  3153  3154  0

c  3 does not represent an automaton state.
c    -(-b^{1, 664}_2 ∧  b^{1, 664}_1 ∧  b^{1, 664}_0 ∧ true) 
c  in CNF:
c     b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ false 
c  in DIMACS:
 3152 -3153 -3154  0
c  -3 does not represent an automaton state.
c    -( b^{1, 664}_2 ∧  b^{1, 664}_1 ∧  b^{1, 664}_0 ∧ true) 
c  in CNF:
c    -b^{1, 664}_2 ∨ -b^{1, 664}_1 ∨ -b^{1, 664}_0 ∨ false 
c  in DIMACS:
-3152 -3153 -3154  0

c i = 665
c  -2+1 --> -1
c    ( b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧  p_665) -> ( b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0)
c  in CNF:
c    -b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨  b^{1, 666}_2
c    -b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_1
c    -b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨  b^{1, 666}_0
c  in DIMACS:
-3155 -3156  3157 -665  3158 0
-3155 -3156  3157 -665 -3159 0
-3155 -3156  3157 -665  3160 0

c  -1+1 --> 0
c    ( b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0 ∧  p_665) -> (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧ -b^{1, 666}_0)
c  in CNF:
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_2
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_1
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_0
c  in DIMACS:
-3155  3156 -3157 -665 -3158 0
-3155  3156 -3157 -665 -3159 0
-3155  3156 -3157 -665 -3160 0

c  0+1 --> 1
c    (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧  p_665) -> (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0)
c  in CNF:
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_2
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_1
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨  b^{1, 666}_0
c  in DIMACS:
 3155  3156  3157 -665 -3158 0
 3155  3156  3157 -665 -3159 0
 3155  3156  3157 -665  3160 0

c  1+1 --> 2
c    (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0 ∧  p_665) -> (-b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0)
c  in CNF:
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_2
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨  b^{1, 666}_1
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ -p_665 ∨ -b^{1, 666}_0
c  in DIMACS:
 3155  3156 -3157 -665 -3158 0
 3155  3156 -3157 -665  3159 0
 3155  3156 -3157 -665 -3160 0

c  2+1 --> break 
c    (-b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧  p_665) -> break
c  in CNF:
c     b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 3155 -3156  3157 -665 1162 0


c  2-1 --> 1
c    (-b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧ -p_665) -> (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0)
c  in CNF:
c     b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_2
c     b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_1
c     b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨  b^{1, 666}_0
c  in DIMACS:
 3155 -3156  3157  665 -3158 0
 3155 -3156  3157  665 -3159 0
 3155 -3156  3157  665  3160 0

c  1-1 --> 0
c    (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0 ∧ -p_665) -> (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧ -b^{1, 666}_0)
c  in CNF:
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_2
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_1
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_0
c  in DIMACS:
 3155  3156 -3157  665 -3158 0
 3155  3156 -3157  665 -3159 0
 3155  3156 -3157  665 -3160 0

c  0-1 --> -1
c    (-b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧ -p_665) -> ( b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0)
c  in CNF:
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨  b^{1, 666}_2
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_1
c     b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨  b^{1, 666}_0
c  in DIMACS:
 3155  3156  3157  665  3158 0
 3155  3156  3157  665 -3159 0
 3155  3156  3157  665  3160 0

c  -1-1 --> -2
c    ( b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧  b^{1, 665}_0 ∧ -p_665) -> ( b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0)
c  in CNF:
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨  b^{1, 666}_2
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨  b^{1, 666}_1
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨  p_665 ∨ -b^{1, 666}_0
c  in DIMACS:
-3155  3156 -3157  665  3158 0
-3155  3156 -3157  665  3159 0
-3155  3156 -3157  665 -3160 0

c  -2-1 --> break 
c    ( b^{1, 665}_2 ∧  b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨  b^{1, 665}_0 ∨  p_665 ∨ break
c  in DIMACS:
-3155 -3156  3157  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 665}_2 ∧ -b^{1, 665}_1 ∧ -b^{1, 665}_0 ∧ true) 
c  in CNF:
c    -b^{1, 665}_2 ∨  b^{1, 665}_1 ∨  b^{1, 665}_0 ∨ false 
c  in DIMACS:
-3155  3156  3157  0

c  3 does not represent an automaton state.
c    -(-b^{1, 665}_2 ∧  b^{1, 665}_1 ∧  b^{1, 665}_0 ∧ true) 
c  in CNF:
c     b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ false 
c  in DIMACS:
 3155 -3156 -3157  0
c  -3 does not represent an automaton state.
c    -( b^{1, 665}_2 ∧  b^{1, 665}_1 ∧  b^{1, 665}_0 ∧ true) 
c  in CNF:
c    -b^{1, 665}_2 ∨ -b^{1, 665}_1 ∨ -b^{1, 665}_0 ∨ false 
c  in DIMACS:
-3155 -3156 -3157  0

c i = 666
c  -2+1 --> -1
c    ( b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧  p_666) -> ( b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0)
c  in CNF:
c    -b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨  b^{1, 667}_2
c    -b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_1
c    -b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨  b^{1, 667}_0
c  in DIMACS:
-3158 -3159  3160 -666  3161 0
-3158 -3159  3160 -666 -3162 0
-3158 -3159  3160 -666  3163 0

c  -1+1 --> 0
c    ( b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0 ∧  p_666) -> (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧ -b^{1, 667}_0)
c  in CNF:
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_2
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_1
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_0
c  in DIMACS:
-3158  3159 -3160 -666 -3161 0
-3158  3159 -3160 -666 -3162 0
-3158  3159 -3160 -666 -3163 0

c  0+1 --> 1
c    (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧  p_666) -> (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0)
c  in CNF:
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_2
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_1
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨  b^{1, 667}_0
c  in DIMACS:
 3158  3159  3160 -666 -3161 0
 3158  3159  3160 -666 -3162 0
 3158  3159  3160 -666  3163 0

c  1+1 --> 2
c    (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0 ∧  p_666) -> (-b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0)
c  in CNF:
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_2
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨  b^{1, 667}_1
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ -p_666 ∨ -b^{1, 667}_0
c  in DIMACS:
 3158  3159 -3160 -666 -3161 0
 3158  3159 -3160 -666  3162 0
 3158  3159 -3160 -666 -3163 0

c  2+1 --> break 
c    (-b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧  p_666) -> break
c  in CNF:
c     b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 3158 -3159  3160 -666 1162 0


c  2-1 --> 1
c    (-b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧ -p_666) -> (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0)
c  in CNF:
c     b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_2
c     b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_1
c     b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨  b^{1, 667}_0
c  in DIMACS:
 3158 -3159  3160  666 -3161 0
 3158 -3159  3160  666 -3162 0
 3158 -3159  3160  666  3163 0

c  1-1 --> 0
c    (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0 ∧ -p_666) -> (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧ -b^{1, 667}_0)
c  in CNF:
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_2
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_1
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_0
c  in DIMACS:
 3158  3159 -3160  666 -3161 0
 3158  3159 -3160  666 -3162 0
 3158  3159 -3160  666 -3163 0

c  0-1 --> -1
c    (-b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧ -p_666) -> ( b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0)
c  in CNF:
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨  b^{1, 667}_2
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_1
c     b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨  b^{1, 667}_0
c  in DIMACS:
 3158  3159  3160  666  3161 0
 3158  3159  3160  666 -3162 0
 3158  3159  3160  666  3163 0

c  -1-1 --> -2
c    ( b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧  b^{1, 666}_0 ∧ -p_666) -> ( b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0)
c  in CNF:
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨  b^{1, 667}_2
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨  b^{1, 667}_1
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨  p_666 ∨ -b^{1, 667}_0
c  in DIMACS:
-3158  3159 -3160  666  3161 0
-3158  3159 -3160  666  3162 0
-3158  3159 -3160  666 -3163 0

c  -2-1 --> break 
c    ( b^{1, 666}_2 ∧  b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨  b^{1, 666}_0 ∨  p_666 ∨ break
c  in DIMACS:
-3158 -3159  3160  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 666}_2 ∧ -b^{1, 666}_1 ∧ -b^{1, 666}_0 ∧ true) 
c  in CNF:
c    -b^{1, 666}_2 ∨  b^{1, 666}_1 ∨  b^{1, 666}_0 ∨ false 
c  in DIMACS:
-3158  3159  3160  0

c  3 does not represent an automaton state.
c    -(-b^{1, 666}_2 ∧  b^{1, 666}_1 ∧  b^{1, 666}_0 ∧ true) 
c  in CNF:
c     b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ false 
c  in DIMACS:
 3158 -3159 -3160  0
c  -3 does not represent an automaton state.
c    -( b^{1, 666}_2 ∧  b^{1, 666}_1 ∧  b^{1, 666}_0 ∧ true) 
c  in CNF:
c    -b^{1, 666}_2 ∨ -b^{1, 666}_1 ∨ -b^{1, 666}_0 ∨ false 
c  in DIMACS:
-3158 -3159 -3160  0

c i = 667
c  -2+1 --> -1
c    ( b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧  p_667) -> ( b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0)
c  in CNF:
c    -b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨  b^{1, 668}_2
c    -b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_1
c    -b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨  b^{1, 668}_0
c  in DIMACS:
-3161 -3162  3163 -667  3164 0
-3161 -3162  3163 -667 -3165 0
-3161 -3162  3163 -667  3166 0

c  -1+1 --> 0
c    ( b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0 ∧  p_667) -> (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧ -b^{1, 668}_0)
c  in CNF:
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_2
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_1
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_0
c  in DIMACS:
-3161  3162 -3163 -667 -3164 0
-3161  3162 -3163 -667 -3165 0
-3161  3162 -3163 -667 -3166 0

c  0+1 --> 1
c    (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧  p_667) -> (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0)
c  in CNF:
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_2
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_1
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨  b^{1, 668}_0
c  in DIMACS:
 3161  3162  3163 -667 -3164 0
 3161  3162  3163 -667 -3165 0
 3161  3162  3163 -667  3166 0

c  1+1 --> 2
c    (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0 ∧  p_667) -> (-b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0)
c  in CNF:
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_2
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨  b^{1, 668}_1
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ -p_667 ∨ -b^{1, 668}_0
c  in DIMACS:
 3161  3162 -3163 -667 -3164 0
 3161  3162 -3163 -667  3165 0
 3161  3162 -3163 -667 -3166 0

c  2+1 --> break 
c    (-b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧  p_667) -> break
c  in CNF:
c     b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ -p_667 ∨ break
c  in DIMACS:
 3161 -3162  3163 -667 1162 0


c  2-1 --> 1
c    (-b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧ -p_667) -> (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0)
c  in CNF:
c     b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_2
c     b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_1
c     b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨  b^{1, 668}_0
c  in DIMACS:
 3161 -3162  3163  667 -3164 0
 3161 -3162  3163  667 -3165 0
 3161 -3162  3163  667  3166 0

c  1-1 --> 0
c    (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0 ∧ -p_667) -> (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧ -b^{1, 668}_0)
c  in CNF:
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_2
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_1
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_0
c  in DIMACS:
 3161  3162 -3163  667 -3164 0
 3161  3162 -3163  667 -3165 0
 3161  3162 -3163  667 -3166 0

c  0-1 --> -1
c    (-b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧ -p_667) -> ( b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0)
c  in CNF:
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨  b^{1, 668}_2
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_1
c     b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨  b^{1, 668}_0
c  in DIMACS:
 3161  3162  3163  667  3164 0
 3161  3162  3163  667 -3165 0
 3161  3162  3163  667  3166 0

c  -1-1 --> -2
c    ( b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧  b^{1, 667}_0 ∧ -p_667) -> ( b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0)
c  in CNF:
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨  b^{1, 668}_2
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨  b^{1, 668}_1
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨  p_667 ∨ -b^{1, 668}_0
c  in DIMACS:
-3161  3162 -3163  667  3164 0
-3161  3162 -3163  667  3165 0
-3161  3162 -3163  667 -3166 0

c  -2-1 --> break 
c    ( b^{1, 667}_2 ∧  b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧ -p_667) -> break
c  in CNF:
c    -b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨  b^{1, 667}_0 ∨  p_667 ∨ break
c  in DIMACS:
-3161 -3162  3163  667 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 667}_2 ∧ -b^{1, 667}_1 ∧ -b^{1, 667}_0 ∧ true) 
c  in CNF:
c    -b^{1, 667}_2 ∨  b^{1, 667}_1 ∨  b^{1, 667}_0 ∨ false 
c  in DIMACS:
-3161  3162  3163  0

c  3 does not represent an automaton state.
c    -(-b^{1, 667}_2 ∧  b^{1, 667}_1 ∧  b^{1, 667}_0 ∧ true) 
c  in CNF:
c     b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ false 
c  in DIMACS:
 3161 -3162 -3163  0
c  -3 does not represent an automaton state.
c    -( b^{1, 667}_2 ∧  b^{1, 667}_1 ∧  b^{1, 667}_0 ∧ true) 
c  in CNF:
c    -b^{1, 667}_2 ∨ -b^{1, 667}_1 ∨ -b^{1, 667}_0 ∨ false 
c  in DIMACS:
-3161 -3162 -3163  0

c i = 668
c  -2+1 --> -1
c    ( b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧  p_668) -> ( b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0)
c  in CNF:
c    -b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨  b^{1, 669}_2
c    -b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_1
c    -b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨  b^{1, 669}_0
c  in DIMACS:
-3164 -3165  3166 -668  3167 0
-3164 -3165  3166 -668 -3168 0
-3164 -3165  3166 -668  3169 0

c  -1+1 --> 0
c    ( b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0 ∧  p_668) -> (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧ -b^{1, 669}_0)
c  in CNF:
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_2
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_1
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_0
c  in DIMACS:
-3164  3165 -3166 -668 -3167 0
-3164  3165 -3166 -668 -3168 0
-3164  3165 -3166 -668 -3169 0

c  0+1 --> 1
c    (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧  p_668) -> (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0)
c  in CNF:
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_2
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_1
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨  b^{1, 669}_0
c  in DIMACS:
 3164  3165  3166 -668 -3167 0
 3164  3165  3166 -668 -3168 0
 3164  3165  3166 -668  3169 0

c  1+1 --> 2
c    (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0 ∧  p_668) -> (-b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0)
c  in CNF:
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_2
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨  b^{1, 669}_1
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ -p_668 ∨ -b^{1, 669}_0
c  in DIMACS:
 3164  3165 -3166 -668 -3167 0
 3164  3165 -3166 -668  3168 0
 3164  3165 -3166 -668 -3169 0

c  2+1 --> break 
c    (-b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧  p_668) -> break
c  in CNF:
c     b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ -p_668 ∨ break
c  in DIMACS:
 3164 -3165  3166 -668 1162 0


c  2-1 --> 1
c    (-b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧ -p_668) -> (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0)
c  in CNF:
c     b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_2
c     b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_1
c     b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨  b^{1, 669}_0
c  in DIMACS:
 3164 -3165  3166  668 -3167 0
 3164 -3165  3166  668 -3168 0
 3164 -3165  3166  668  3169 0

c  1-1 --> 0
c    (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0 ∧ -p_668) -> (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧ -b^{1, 669}_0)
c  in CNF:
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_2
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_1
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_0
c  in DIMACS:
 3164  3165 -3166  668 -3167 0
 3164  3165 -3166  668 -3168 0
 3164  3165 -3166  668 -3169 0

c  0-1 --> -1
c    (-b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧ -p_668) -> ( b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0)
c  in CNF:
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨  b^{1, 669}_2
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_1
c     b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨  b^{1, 669}_0
c  in DIMACS:
 3164  3165  3166  668  3167 0
 3164  3165  3166  668 -3168 0
 3164  3165  3166  668  3169 0

c  -1-1 --> -2
c    ( b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧  b^{1, 668}_0 ∧ -p_668) -> ( b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0)
c  in CNF:
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨  b^{1, 669}_2
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨  b^{1, 669}_1
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨  p_668 ∨ -b^{1, 669}_0
c  in DIMACS:
-3164  3165 -3166  668  3167 0
-3164  3165 -3166  668  3168 0
-3164  3165 -3166  668 -3169 0

c  -2-1 --> break 
c    ( b^{1, 668}_2 ∧  b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧ -p_668) -> break
c  in CNF:
c    -b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨  b^{1, 668}_0 ∨  p_668 ∨ break
c  in DIMACS:
-3164 -3165  3166  668 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 668}_2 ∧ -b^{1, 668}_1 ∧ -b^{1, 668}_0 ∧ true) 
c  in CNF:
c    -b^{1, 668}_2 ∨  b^{1, 668}_1 ∨  b^{1, 668}_0 ∨ false 
c  in DIMACS:
-3164  3165  3166  0

c  3 does not represent an automaton state.
c    -(-b^{1, 668}_2 ∧  b^{1, 668}_1 ∧  b^{1, 668}_0 ∧ true) 
c  in CNF:
c     b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ false 
c  in DIMACS:
 3164 -3165 -3166  0
c  -3 does not represent an automaton state.
c    -( b^{1, 668}_2 ∧  b^{1, 668}_1 ∧  b^{1, 668}_0 ∧ true) 
c  in CNF:
c    -b^{1, 668}_2 ∨ -b^{1, 668}_1 ∨ -b^{1, 668}_0 ∨ false 
c  in DIMACS:
-3164 -3165 -3166  0

c i = 669
c  -2+1 --> -1
c    ( b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧  p_669) -> ( b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0)
c  in CNF:
c    -b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨  b^{1, 670}_2
c    -b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_1
c    -b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨  b^{1, 670}_0
c  in DIMACS:
-3167 -3168  3169 -669  3170 0
-3167 -3168  3169 -669 -3171 0
-3167 -3168  3169 -669  3172 0

c  -1+1 --> 0
c    ( b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0 ∧  p_669) -> (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧ -b^{1, 670}_0)
c  in CNF:
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_2
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_1
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_0
c  in DIMACS:
-3167  3168 -3169 -669 -3170 0
-3167  3168 -3169 -669 -3171 0
-3167  3168 -3169 -669 -3172 0

c  0+1 --> 1
c    (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧  p_669) -> (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0)
c  in CNF:
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_2
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_1
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨  b^{1, 670}_0
c  in DIMACS:
 3167  3168  3169 -669 -3170 0
 3167  3168  3169 -669 -3171 0
 3167  3168  3169 -669  3172 0

c  1+1 --> 2
c    (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0 ∧  p_669) -> (-b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0)
c  in CNF:
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_2
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨  b^{1, 670}_1
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ -p_669 ∨ -b^{1, 670}_0
c  in DIMACS:
 3167  3168 -3169 -669 -3170 0
 3167  3168 -3169 -669  3171 0
 3167  3168 -3169 -669 -3172 0

c  2+1 --> break 
c    (-b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧  p_669) -> break
c  in CNF:
c     b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ -p_669 ∨ break
c  in DIMACS:
 3167 -3168  3169 -669 1162 0


c  2-1 --> 1
c    (-b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧ -p_669) -> (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0)
c  in CNF:
c     b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_2
c     b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_1
c     b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨  b^{1, 670}_0
c  in DIMACS:
 3167 -3168  3169  669 -3170 0
 3167 -3168  3169  669 -3171 0
 3167 -3168  3169  669  3172 0

c  1-1 --> 0
c    (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0 ∧ -p_669) -> (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧ -b^{1, 670}_0)
c  in CNF:
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_2
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_1
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_0
c  in DIMACS:
 3167  3168 -3169  669 -3170 0
 3167  3168 -3169  669 -3171 0
 3167  3168 -3169  669 -3172 0

c  0-1 --> -1
c    (-b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧ -p_669) -> ( b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0)
c  in CNF:
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨  b^{1, 670}_2
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_1
c     b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨  b^{1, 670}_0
c  in DIMACS:
 3167  3168  3169  669  3170 0
 3167  3168  3169  669 -3171 0
 3167  3168  3169  669  3172 0

c  -1-1 --> -2
c    ( b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧  b^{1, 669}_0 ∧ -p_669) -> ( b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0)
c  in CNF:
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨  b^{1, 670}_2
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨  b^{1, 670}_1
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨  p_669 ∨ -b^{1, 670}_0
c  in DIMACS:
-3167  3168 -3169  669  3170 0
-3167  3168 -3169  669  3171 0
-3167  3168 -3169  669 -3172 0

c  -2-1 --> break 
c    ( b^{1, 669}_2 ∧  b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧ -p_669) -> break
c  in CNF:
c    -b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨  b^{1, 669}_0 ∨  p_669 ∨ break
c  in DIMACS:
-3167 -3168  3169  669 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 669}_2 ∧ -b^{1, 669}_1 ∧ -b^{1, 669}_0 ∧ true) 
c  in CNF:
c    -b^{1, 669}_2 ∨  b^{1, 669}_1 ∨  b^{1, 669}_0 ∨ false 
c  in DIMACS:
-3167  3168  3169  0

c  3 does not represent an automaton state.
c    -(-b^{1, 669}_2 ∧  b^{1, 669}_1 ∧  b^{1, 669}_0 ∧ true) 
c  in CNF:
c     b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ false 
c  in DIMACS:
 3167 -3168 -3169  0
c  -3 does not represent an automaton state.
c    -( b^{1, 669}_2 ∧  b^{1, 669}_1 ∧  b^{1, 669}_0 ∧ true) 
c  in CNF:
c    -b^{1, 669}_2 ∨ -b^{1, 669}_1 ∨ -b^{1, 669}_0 ∨ false 
c  in DIMACS:
-3167 -3168 -3169  0

c i = 670
c  -2+1 --> -1
c    ( b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧  p_670) -> ( b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0)
c  in CNF:
c    -b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨  b^{1, 671}_2
c    -b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_1
c    -b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨  b^{1, 671}_0
c  in DIMACS:
-3170 -3171  3172 -670  3173 0
-3170 -3171  3172 -670 -3174 0
-3170 -3171  3172 -670  3175 0

c  -1+1 --> 0
c    ( b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0 ∧  p_670) -> (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧ -b^{1, 671}_0)
c  in CNF:
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_2
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_1
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_0
c  in DIMACS:
-3170  3171 -3172 -670 -3173 0
-3170  3171 -3172 -670 -3174 0
-3170  3171 -3172 -670 -3175 0

c  0+1 --> 1
c    (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧  p_670) -> (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0)
c  in CNF:
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_2
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_1
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨  b^{1, 671}_0
c  in DIMACS:
 3170  3171  3172 -670 -3173 0
 3170  3171  3172 -670 -3174 0
 3170  3171  3172 -670  3175 0

c  1+1 --> 2
c    (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0 ∧  p_670) -> (-b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0)
c  in CNF:
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_2
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨  b^{1, 671}_1
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ -p_670 ∨ -b^{1, 671}_0
c  in DIMACS:
 3170  3171 -3172 -670 -3173 0
 3170  3171 -3172 -670  3174 0
 3170  3171 -3172 -670 -3175 0

c  2+1 --> break 
c    (-b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧  p_670) -> break
c  in CNF:
c     b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 3170 -3171  3172 -670 1162 0


c  2-1 --> 1
c    (-b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧ -p_670) -> (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0)
c  in CNF:
c     b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_2
c     b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_1
c     b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨  b^{1, 671}_0
c  in DIMACS:
 3170 -3171  3172  670 -3173 0
 3170 -3171  3172  670 -3174 0
 3170 -3171  3172  670  3175 0

c  1-1 --> 0
c    (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0 ∧ -p_670) -> (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧ -b^{1, 671}_0)
c  in CNF:
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_2
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_1
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_0
c  in DIMACS:
 3170  3171 -3172  670 -3173 0
 3170  3171 -3172  670 -3174 0
 3170  3171 -3172  670 -3175 0

c  0-1 --> -1
c    (-b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧ -p_670) -> ( b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0)
c  in CNF:
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨  b^{1, 671}_2
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_1
c     b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨  b^{1, 671}_0
c  in DIMACS:
 3170  3171  3172  670  3173 0
 3170  3171  3172  670 -3174 0
 3170  3171  3172  670  3175 0

c  -1-1 --> -2
c    ( b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧  b^{1, 670}_0 ∧ -p_670) -> ( b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0)
c  in CNF:
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨  b^{1, 671}_2
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨  b^{1, 671}_1
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨  p_670 ∨ -b^{1, 671}_0
c  in DIMACS:
-3170  3171 -3172  670  3173 0
-3170  3171 -3172  670  3174 0
-3170  3171 -3172  670 -3175 0

c  -2-1 --> break 
c    ( b^{1, 670}_2 ∧  b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨  b^{1, 670}_0 ∨  p_670 ∨ break
c  in DIMACS:
-3170 -3171  3172  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 670}_2 ∧ -b^{1, 670}_1 ∧ -b^{1, 670}_0 ∧ true) 
c  in CNF:
c    -b^{1, 670}_2 ∨  b^{1, 670}_1 ∨  b^{1, 670}_0 ∨ false 
c  in DIMACS:
-3170  3171  3172  0

c  3 does not represent an automaton state.
c    -(-b^{1, 670}_2 ∧  b^{1, 670}_1 ∧  b^{1, 670}_0 ∧ true) 
c  in CNF:
c     b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ false 
c  in DIMACS:
 3170 -3171 -3172  0
c  -3 does not represent an automaton state.
c    -( b^{1, 670}_2 ∧  b^{1, 670}_1 ∧  b^{1, 670}_0 ∧ true) 
c  in CNF:
c    -b^{1, 670}_2 ∨ -b^{1, 670}_1 ∨ -b^{1, 670}_0 ∨ false 
c  in DIMACS:
-3170 -3171 -3172  0

c i = 671
c  -2+1 --> -1
c    ( b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧  p_671) -> ( b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0)
c  in CNF:
c    -b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨  b^{1, 672}_2
c    -b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_1
c    -b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨  b^{1, 672}_0
c  in DIMACS:
-3173 -3174  3175 -671  3176 0
-3173 -3174  3175 -671 -3177 0
-3173 -3174  3175 -671  3178 0

c  -1+1 --> 0
c    ( b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0 ∧  p_671) -> (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧ -b^{1, 672}_0)
c  in CNF:
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_2
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_1
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_0
c  in DIMACS:
-3173  3174 -3175 -671 -3176 0
-3173  3174 -3175 -671 -3177 0
-3173  3174 -3175 -671 -3178 0

c  0+1 --> 1
c    (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧  p_671) -> (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0)
c  in CNF:
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_2
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_1
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨  b^{1, 672}_0
c  in DIMACS:
 3173  3174  3175 -671 -3176 0
 3173  3174  3175 -671 -3177 0
 3173  3174  3175 -671  3178 0

c  1+1 --> 2
c    (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0 ∧  p_671) -> (-b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0)
c  in CNF:
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_2
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨  b^{1, 672}_1
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ -p_671 ∨ -b^{1, 672}_0
c  in DIMACS:
 3173  3174 -3175 -671 -3176 0
 3173  3174 -3175 -671  3177 0
 3173  3174 -3175 -671 -3178 0

c  2+1 --> break 
c    (-b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧  p_671) -> break
c  in CNF:
c     b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ -p_671 ∨ break
c  in DIMACS:
 3173 -3174  3175 -671 1162 0


c  2-1 --> 1
c    (-b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧ -p_671) -> (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0)
c  in CNF:
c     b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_2
c     b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_1
c     b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨  b^{1, 672}_0
c  in DIMACS:
 3173 -3174  3175  671 -3176 0
 3173 -3174  3175  671 -3177 0
 3173 -3174  3175  671  3178 0

c  1-1 --> 0
c    (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0 ∧ -p_671) -> (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧ -b^{1, 672}_0)
c  in CNF:
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_2
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_1
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_0
c  in DIMACS:
 3173  3174 -3175  671 -3176 0
 3173  3174 -3175  671 -3177 0
 3173  3174 -3175  671 -3178 0

c  0-1 --> -1
c    (-b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧ -p_671) -> ( b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0)
c  in CNF:
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨  b^{1, 672}_2
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_1
c     b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨  b^{1, 672}_0
c  in DIMACS:
 3173  3174  3175  671  3176 0
 3173  3174  3175  671 -3177 0
 3173  3174  3175  671  3178 0

c  -1-1 --> -2
c    ( b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧  b^{1, 671}_0 ∧ -p_671) -> ( b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0)
c  in CNF:
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨  b^{1, 672}_2
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨  b^{1, 672}_1
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨  p_671 ∨ -b^{1, 672}_0
c  in DIMACS:
-3173  3174 -3175  671  3176 0
-3173  3174 -3175  671  3177 0
-3173  3174 -3175  671 -3178 0

c  -2-1 --> break 
c    ( b^{1, 671}_2 ∧  b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧ -p_671) -> break
c  in CNF:
c    -b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨  b^{1, 671}_0 ∨  p_671 ∨ break
c  in DIMACS:
-3173 -3174  3175  671 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 671}_2 ∧ -b^{1, 671}_1 ∧ -b^{1, 671}_0 ∧ true) 
c  in CNF:
c    -b^{1, 671}_2 ∨  b^{1, 671}_1 ∨  b^{1, 671}_0 ∨ false 
c  in DIMACS:
-3173  3174  3175  0

c  3 does not represent an automaton state.
c    -(-b^{1, 671}_2 ∧  b^{1, 671}_1 ∧  b^{1, 671}_0 ∧ true) 
c  in CNF:
c     b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ false 
c  in DIMACS:
 3173 -3174 -3175  0
c  -3 does not represent an automaton state.
c    -( b^{1, 671}_2 ∧  b^{1, 671}_1 ∧  b^{1, 671}_0 ∧ true) 
c  in CNF:
c    -b^{1, 671}_2 ∨ -b^{1, 671}_1 ∨ -b^{1, 671}_0 ∨ false 
c  in DIMACS:
-3173 -3174 -3175  0

c i = 672
c  -2+1 --> -1
c    ( b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧  p_672) -> ( b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0)
c  in CNF:
c    -b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨  b^{1, 673}_2
c    -b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_1
c    -b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨  b^{1, 673}_0
c  in DIMACS:
-3176 -3177  3178 -672  3179 0
-3176 -3177  3178 -672 -3180 0
-3176 -3177  3178 -672  3181 0

c  -1+1 --> 0
c    ( b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0 ∧  p_672) -> (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧ -b^{1, 673}_0)
c  in CNF:
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_2
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_1
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_0
c  in DIMACS:
-3176  3177 -3178 -672 -3179 0
-3176  3177 -3178 -672 -3180 0
-3176  3177 -3178 -672 -3181 0

c  0+1 --> 1
c    (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧  p_672) -> (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0)
c  in CNF:
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_2
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_1
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨  b^{1, 673}_0
c  in DIMACS:
 3176  3177  3178 -672 -3179 0
 3176  3177  3178 -672 -3180 0
 3176  3177  3178 -672  3181 0

c  1+1 --> 2
c    (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0 ∧  p_672) -> (-b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0)
c  in CNF:
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_2
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨  b^{1, 673}_1
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ -p_672 ∨ -b^{1, 673}_0
c  in DIMACS:
 3176  3177 -3178 -672 -3179 0
 3176  3177 -3178 -672  3180 0
 3176  3177 -3178 -672 -3181 0

c  2+1 --> break 
c    (-b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧  p_672) -> break
c  in CNF:
c     b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 3176 -3177  3178 -672 1162 0


c  2-1 --> 1
c    (-b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧ -p_672) -> (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0)
c  in CNF:
c     b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_2
c     b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_1
c     b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨  b^{1, 673}_0
c  in DIMACS:
 3176 -3177  3178  672 -3179 0
 3176 -3177  3178  672 -3180 0
 3176 -3177  3178  672  3181 0

c  1-1 --> 0
c    (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0 ∧ -p_672) -> (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧ -b^{1, 673}_0)
c  in CNF:
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_2
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_1
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_0
c  in DIMACS:
 3176  3177 -3178  672 -3179 0
 3176  3177 -3178  672 -3180 0
 3176  3177 -3178  672 -3181 0

c  0-1 --> -1
c    (-b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧ -p_672) -> ( b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0)
c  in CNF:
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨  b^{1, 673}_2
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_1
c     b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨  b^{1, 673}_0
c  in DIMACS:
 3176  3177  3178  672  3179 0
 3176  3177  3178  672 -3180 0
 3176  3177  3178  672  3181 0

c  -1-1 --> -2
c    ( b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧  b^{1, 672}_0 ∧ -p_672) -> ( b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0)
c  in CNF:
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨  b^{1, 673}_2
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨  b^{1, 673}_1
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨  p_672 ∨ -b^{1, 673}_0
c  in DIMACS:
-3176  3177 -3178  672  3179 0
-3176  3177 -3178  672  3180 0
-3176  3177 -3178  672 -3181 0

c  -2-1 --> break 
c    ( b^{1, 672}_2 ∧  b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨  b^{1, 672}_0 ∨  p_672 ∨ break
c  in DIMACS:
-3176 -3177  3178  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 672}_2 ∧ -b^{1, 672}_1 ∧ -b^{1, 672}_0 ∧ true) 
c  in CNF:
c    -b^{1, 672}_2 ∨  b^{1, 672}_1 ∨  b^{1, 672}_0 ∨ false 
c  in DIMACS:
-3176  3177  3178  0

c  3 does not represent an automaton state.
c    -(-b^{1, 672}_2 ∧  b^{1, 672}_1 ∧  b^{1, 672}_0 ∧ true) 
c  in CNF:
c     b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ false 
c  in DIMACS:
 3176 -3177 -3178  0
c  -3 does not represent an automaton state.
c    -( b^{1, 672}_2 ∧  b^{1, 672}_1 ∧  b^{1, 672}_0 ∧ true) 
c  in CNF:
c    -b^{1, 672}_2 ∨ -b^{1, 672}_1 ∨ -b^{1, 672}_0 ∨ false 
c  in DIMACS:
-3176 -3177 -3178  0

c i = 673
c  -2+1 --> -1
c    ( b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧  p_673) -> ( b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0)
c  in CNF:
c    -b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨  b^{1, 674}_2
c    -b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_1
c    -b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨  b^{1, 674}_0
c  in DIMACS:
-3179 -3180  3181 -673  3182 0
-3179 -3180  3181 -673 -3183 0
-3179 -3180  3181 -673  3184 0

c  -1+1 --> 0
c    ( b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0 ∧  p_673) -> (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧ -b^{1, 674}_0)
c  in CNF:
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_2
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_1
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_0
c  in DIMACS:
-3179  3180 -3181 -673 -3182 0
-3179  3180 -3181 -673 -3183 0
-3179  3180 -3181 -673 -3184 0

c  0+1 --> 1
c    (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧  p_673) -> (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0)
c  in CNF:
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_2
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_1
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨  b^{1, 674}_0
c  in DIMACS:
 3179  3180  3181 -673 -3182 0
 3179  3180  3181 -673 -3183 0
 3179  3180  3181 -673  3184 0

c  1+1 --> 2
c    (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0 ∧  p_673) -> (-b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0)
c  in CNF:
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_2
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨  b^{1, 674}_1
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ -p_673 ∨ -b^{1, 674}_0
c  in DIMACS:
 3179  3180 -3181 -673 -3182 0
 3179  3180 -3181 -673  3183 0
 3179  3180 -3181 -673 -3184 0

c  2+1 --> break 
c    (-b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧  p_673) -> break
c  in CNF:
c     b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ -p_673 ∨ break
c  in DIMACS:
 3179 -3180  3181 -673 1162 0


c  2-1 --> 1
c    (-b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧ -p_673) -> (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0)
c  in CNF:
c     b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_2
c     b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_1
c     b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨  b^{1, 674}_0
c  in DIMACS:
 3179 -3180  3181  673 -3182 0
 3179 -3180  3181  673 -3183 0
 3179 -3180  3181  673  3184 0

c  1-1 --> 0
c    (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0 ∧ -p_673) -> (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧ -b^{1, 674}_0)
c  in CNF:
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_2
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_1
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_0
c  in DIMACS:
 3179  3180 -3181  673 -3182 0
 3179  3180 -3181  673 -3183 0
 3179  3180 -3181  673 -3184 0

c  0-1 --> -1
c    (-b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧ -p_673) -> ( b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0)
c  in CNF:
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨  b^{1, 674}_2
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_1
c     b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨  b^{1, 674}_0
c  in DIMACS:
 3179  3180  3181  673  3182 0
 3179  3180  3181  673 -3183 0
 3179  3180  3181  673  3184 0

c  -1-1 --> -2
c    ( b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧  b^{1, 673}_0 ∧ -p_673) -> ( b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0)
c  in CNF:
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨  b^{1, 674}_2
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨  b^{1, 674}_1
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨  p_673 ∨ -b^{1, 674}_0
c  in DIMACS:
-3179  3180 -3181  673  3182 0
-3179  3180 -3181  673  3183 0
-3179  3180 -3181  673 -3184 0

c  -2-1 --> break 
c    ( b^{1, 673}_2 ∧  b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧ -p_673) -> break
c  in CNF:
c    -b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨  b^{1, 673}_0 ∨  p_673 ∨ break
c  in DIMACS:
-3179 -3180  3181  673 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 673}_2 ∧ -b^{1, 673}_1 ∧ -b^{1, 673}_0 ∧ true) 
c  in CNF:
c    -b^{1, 673}_2 ∨  b^{1, 673}_1 ∨  b^{1, 673}_0 ∨ false 
c  in DIMACS:
-3179  3180  3181  0

c  3 does not represent an automaton state.
c    -(-b^{1, 673}_2 ∧  b^{1, 673}_1 ∧  b^{1, 673}_0 ∧ true) 
c  in CNF:
c     b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ false 
c  in DIMACS:
 3179 -3180 -3181  0
c  -3 does not represent an automaton state.
c    -( b^{1, 673}_2 ∧  b^{1, 673}_1 ∧  b^{1, 673}_0 ∧ true) 
c  in CNF:
c    -b^{1, 673}_2 ∨ -b^{1, 673}_1 ∨ -b^{1, 673}_0 ∨ false 
c  in DIMACS:
-3179 -3180 -3181  0

c i = 674
c  -2+1 --> -1
c    ( b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧  p_674) -> ( b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0)
c  in CNF:
c    -b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨  b^{1, 675}_2
c    -b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_1
c    -b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨  b^{1, 675}_0
c  in DIMACS:
-3182 -3183  3184 -674  3185 0
-3182 -3183  3184 -674 -3186 0
-3182 -3183  3184 -674  3187 0

c  -1+1 --> 0
c    ( b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0 ∧  p_674) -> (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧ -b^{1, 675}_0)
c  in CNF:
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_2
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_1
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_0
c  in DIMACS:
-3182  3183 -3184 -674 -3185 0
-3182  3183 -3184 -674 -3186 0
-3182  3183 -3184 -674 -3187 0

c  0+1 --> 1
c    (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧  p_674) -> (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0)
c  in CNF:
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_2
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_1
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨  b^{1, 675}_0
c  in DIMACS:
 3182  3183  3184 -674 -3185 0
 3182  3183  3184 -674 -3186 0
 3182  3183  3184 -674  3187 0

c  1+1 --> 2
c    (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0 ∧  p_674) -> (-b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0)
c  in CNF:
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_2
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨  b^{1, 675}_1
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ -p_674 ∨ -b^{1, 675}_0
c  in DIMACS:
 3182  3183 -3184 -674 -3185 0
 3182  3183 -3184 -674  3186 0
 3182  3183 -3184 -674 -3187 0

c  2+1 --> break 
c    (-b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧  p_674) -> break
c  in CNF:
c     b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ -p_674 ∨ break
c  in DIMACS:
 3182 -3183  3184 -674 1162 0


c  2-1 --> 1
c    (-b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧ -p_674) -> (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0)
c  in CNF:
c     b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_2
c     b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_1
c     b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨  b^{1, 675}_0
c  in DIMACS:
 3182 -3183  3184  674 -3185 0
 3182 -3183  3184  674 -3186 0
 3182 -3183  3184  674  3187 0

c  1-1 --> 0
c    (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0 ∧ -p_674) -> (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧ -b^{1, 675}_0)
c  in CNF:
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_2
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_1
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_0
c  in DIMACS:
 3182  3183 -3184  674 -3185 0
 3182  3183 -3184  674 -3186 0
 3182  3183 -3184  674 -3187 0

c  0-1 --> -1
c    (-b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧ -p_674) -> ( b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0)
c  in CNF:
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨  b^{1, 675}_2
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_1
c     b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨  b^{1, 675}_0
c  in DIMACS:
 3182  3183  3184  674  3185 0
 3182  3183  3184  674 -3186 0
 3182  3183  3184  674  3187 0

c  -1-1 --> -2
c    ( b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧  b^{1, 674}_0 ∧ -p_674) -> ( b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0)
c  in CNF:
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨  b^{1, 675}_2
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨  b^{1, 675}_1
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨  p_674 ∨ -b^{1, 675}_0
c  in DIMACS:
-3182  3183 -3184  674  3185 0
-3182  3183 -3184  674  3186 0
-3182  3183 -3184  674 -3187 0

c  -2-1 --> break 
c    ( b^{1, 674}_2 ∧  b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧ -p_674) -> break
c  in CNF:
c    -b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨  b^{1, 674}_0 ∨  p_674 ∨ break
c  in DIMACS:
-3182 -3183  3184  674 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 674}_2 ∧ -b^{1, 674}_1 ∧ -b^{1, 674}_0 ∧ true) 
c  in CNF:
c    -b^{1, 674}_2 ∨  b^{1, 674}_1 ∨  b^{1, 674}_0 ∨ false 
c  in DIMACS:
-3182  3183  3184  0

c  3 does not represent an automaton state.
c    -(-b^{1, 674}_2 ∧  b^{1, 674}_1 ∧  b^{1, 674}_0 ∧ true) 
c  in CNF:
c     b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ false 
c  in DIMACS:
 3182 -3183 -3184  0
c  -3 does not represent an automaton state.
c    -( b^{1, 674}_2 ∧  b^{1, 674}_1 ∧  b^{1, 674}_0 ∧ true) 
c  in CNF:
c    -b^{1, 674}_2 ∨ -b^{1, 674}_1 ∨ -b^{1, 674}_0 ∨ false 
c  in DIMACS:
-3182 -3183 -3184  0

c i = 675
c  -2+1 --> -1
c    ( b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧  p_675) -> ( b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0)
c  in CNF:
c    -b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨  b^{1, 676}_2
c    -b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_1
c    -b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨  b^{1, 676}_0
c  in DIMACS:
-3185 -3186  3187 -675  3188 0
-3185 -3186  3187 -675 -3189 0
-3185 -3186  3187 -675  3190 0

c  -1+1 --> 0
c    ( b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0 ∧  p_675) -> (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧ -b^{1, 676}_0)
c  in CNF:
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_2
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_1
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_0
c  in DIMACS:
-3185  3186 -3187 -675 -3188 0
-3185  3186 -3187 -675 -3189 0
-3185  3186 -3187 -675 -3190 0

c  0+1 --> 1
c    (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧  p_675) -> (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0)
c  in CNF:
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_2
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_1
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨  b^{1, 676}_0
c  in DIMACS:
 3185  3186  3187 -675 -3188 0
 3185  3186  3187 -675 -3189 0
 3185  3186  3187 -675  3190 0

c  1+1 --> 2
c    (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0 ∧  p_675) -> (-b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0)
c  in CNF:
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_2
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨  b^{1, 676}_1
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ -p_675 ∨ -b^{1, 676}_0
c  in DIMACS:
 3185  3186 -3187 -675 -3188 0
 3185  3186 -3187 -675  3189 0
 3185  3186 -3187 -675 -3190 0

c  2+1 --> break 
c    (-b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧  p_675) -> break
c  in CNF:
c     b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 3185 -3186  3187 -675 1162 0


c  2-1 --> 1
c    (-b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧ -p_675) -> (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0)
c  in CNF:
c     b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_2
c     b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_1
c     b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨  b^{1, 676}_0
c  in DIMACS:
 3185 -3186  3187  675 -3188 0
 3185 -3186  3187  675 -3189 0
 3185 -3186  3187  675  3190 0

c  1-1 --> 0
c    (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0 ∧ -p_675) -> (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧ -b^{1, 676}_0)
c  in CNF:
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_2
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_1
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_0
c  in DIMACS:
 3185  3186 -3187  675 -3188 0
 3185  3186 -3187  675 -3189 0
 3185  3186 -3187  675 -3190 0

c  0-1 --> -1
c    (-b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧ -p_675) -> ( b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0)
c  in CNF:
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨  b^{1, 676}_2
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_1
c     b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨  b^{1, 676}_0
c  in DIMACS:
 3185  3186  3187  675  3188 0
 3185  3186  3187  675 -3189 0
 3185  3186  3187  675  3190 0

c  -1-1 --> -2
c    ( b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧  b^{1, 675}_0 ∧ -p_675) -> ( b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0)
c  in CNF:
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨  b^{1, 676}_2
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨  b^{1, 676}_1
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨  p_675 ∨ -b^{1, 676}_0
c  in DIMACS:
-3185  3186 -3187  675  3188 0
-3185  3186 -3187  675  3189 0
-3185  3186 -3187  675 -3190 0

c  -2-1 --> break 
c    ( b^{1, 675}_2 ∧  b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨  b^{1, 675}_0 ∨  p_675 ∨ break
c  in DIMACS:
-3185 -3186  3187  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 675}_2 ∧ -b^{1, 675}_1 ∧ -b^{1, 675}_0 ∧ true) 
c  in CNF:
c    -b^{1, 675}_2 ∨  b^{1, 675}_1 ∨  b^{1, 675}_0 ∨ false 
c  in DIMACS:
-3185  3186  3187  0

c  3 does not represent an automaton state.
c    -(-b^{1, 675}_2 ∧  b^{1, 675}_1 ∧  b^{1, 675}_0 ∧ true) 
c  in CNF:
c     b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ false 
c  in DIMACS:
 3185 -3186 -3187  0
c  -3 does not represent an automaton state.
c    -( b^{1, 675}_2 ∧  b^{1, 675}_1 ∧  b^{1, 675}_0 ∧ true) 
c  in CNF:
c    -b^{1, 675}_2 ∨ -b^{1, 675}_1 ∨ -b^{1, 675}_0 ∨ false 
c  in DIMACS:
-3185 -3186 -3187  0

c i = 676
c  -2+1 --> -1
c    ( b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧  p_676) -> ( b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0)
c  in CNF:
c    -b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨  b^{1, 677}_2
c    -b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_1
c    -b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨  b^{1, 677}_0
c  in DIMACS:
-3188 -3189  3190 -676  3191 0
-3188 -3189  3190 -676 -3192 0
-3188 -3189  3190 -676  3193 0

c  -1+1 --> 0
c    ( b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0 ∧  p_676) -> (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧ -b^{1, 677}_0)
c  in CNF:
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_2
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_1
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_0
c  in DIMACS:
-3188  3189 -3190 -676 -3191 0
-3188  3189 -3190 -676 -3192 0
-3188  3189 -3190 -676 -3193 0

c  0+1 --> 1
c    (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧  p_676) -> (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0)
c  in CNF:
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_2
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_1
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨  b^{1, 677}_0
c  in DIMACS:
 3188  3189  3190 -676 -3191 0
 3188  3189  3190 -676 -3192 0
 3188  3189  3190 -676  3193 0

c  1+1 --> 2
c    (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0 ∧  p_676) -> (-b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0)
c  in CNF:
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_2
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨  b^{1, 677}_1
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ -p_676 ∨ -b^{1, 677}_0
c  in DIMACS:
 3188  3189 -3190 -676 -3191 0
 3188  3189 -3190 -676  3192 0
 3188  3189 -3190 -676 -3193 0

c  2+1 --> break 
c    (-b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧  p_676) -> break
c  in CNF:
c     b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 3188 -3189  3190 -676 1162 0


c  2-1 --> 1
c    (-b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧ -p_676) -> (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0)
c  in CNF:
c     b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_2
c     b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_1
c     b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨  b^{1, 677}_0
c  in DIMACS:
 3188 -3189  3190  676 -3191 0
 3188 -3189  3190  676 -3192 0
 3188 -3189  3190  676  3193 0

c  1-1 --> 0
c    (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0 ∧ -p_676) -> (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧ -b^{1, 677}_0)
c  in CNF:
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_2
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_1
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_0
c  in DIMACS:
 3188  3189 -3190  676 -3191 0
 3188  3189 -3190  676 -3192 0
 3188  3189 -3190  676 -3193 0

c  0-1 --> -1
c    (-b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧ -p_676) -> ( b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0)
c  in CNF:
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨  b^{1, 677}_2
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_1
c     b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨  b^{1, 677}_0
c  in DIMACS:
 3188  3189  3190  676  3191 0
 3188  3189  3190  676 -3192 0
 3188  3189  3190  676  3193 0

c  -1-1 --> -2
c    ( b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧  b^{1, 676}_0 ∧ -p_676) -> ( b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0)
c  in CNF:
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨  b^{1, 677}_2
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨  b^{1, 677}_1
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨  p_676 ∨ -b^{1, 677}_0
c  in DIMACS:
-3188  3189 -3190  676  3191 0
-3188  3189 -3190  676  3192 0
-3188  3189 -3190  676 -3193 0

c  -2-1 --> break 
c    ( b^{1, 676}_2 ∧  b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨  b^{1, 676}_0 ∨  p_676 ∨ break
c  in DIMACS:
-3188 -3189  3190  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 676}_2 ∧ -b^{1, 676}_1 ∧ -b^{1, 676}_0 ∧ true) 
c  in CNF:
c    -b^{1, 676}_2 ∨  b^{1, 676}_1 ∨  b^{1, 676}_0 ∨ false 
c  in DIMACS:
-3188  3189  3190  0

c  3 does not represent an automaton state.
c    -(-b^{1, 676}_2 ∧  b^{1, 676}_1 ∧  b^{1, 676}_0 ∧ true) 
c  in CNF:
c     b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ false 
c  in DIMACS:
 3188 -3189 -3190  0
c  -3 does not represent an automaton state.
c    -( b^{1, 676}_2 ∧  b^{1, 676}_1 ∧  b^{1, 676}_0 ∧ true) 
c  in CNF:
c    -b^{1, 676}_2 ∨ -b^{1, 676}_1 ∨ -b^{1, 676}_0 ∨ false 
c  in DIMACS:
-3188 -3189 -3190  0

c i = 677
c  -2+1 --> -1
c    ( b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧  p_677) -> ( b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0)
c  in CNF:
c    -b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨  b^{1, 678}_2
c    -b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_1
c    -b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨  b^{1, 678}_0
c  in DIMACS:
-3191 -3192  3193 -677  3194 0
-3191 -3192  3193 -677 -3195 0
-3191 -3192  3193 -677  3196 0

c  -1+1 --> 0
c    ( b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0 ∧  p_677) -> (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧ -b^{1, 678}_0)
c  in CNF:
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_2
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_1
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_0
c  in DIMACS:
-3191  3192 -3193 -677 -3194 0
-3191  3192 -3193 -677 -3195 0
-3191  3192 -3193 -677 -3196 0

c  0+1 --> 1
c    (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧  p_677) -> (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0)
c  in CNF:
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_2
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_1
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨  b^{1, 678}_0
c  in DIMACS:
 3191  3192  3193 -677 -3194 0
 3191  3192  3193 -677 -3195 0
 3191  3192  3193 -677  3196 0

c  1+1 --> 2
c    (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0 ∧  p_677) -> (-b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0)
c  in CNF:
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_2
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨  b^{1, 678}_1
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ -p_677 ∨ -b^{1, 678}_0
c  in DIMACS:
 3191  3192 -3193 -677 -3194 0
 3191  3192 -3193 -677  3195 0
 3191  3192 -3193 -677 -3196 0

c  2+1 --> break 
c    (-b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧  p_677) -> break
c  in CNF:
c     b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ -p_677 ∨ break
c  in DIMACS:
 3191 -3192  3193 -677 1162 0


c  2-1 --> 1
c    (-b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧ -p_677) -> (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0)
c  in CNF:
c     b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_2
c     b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_1
c     b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨  b^{1, 678}_0
c  in DIMACS:
 3191 -3192  3193  677 -3194 0
 3191 -3192  3193  677 -3195 0
 3191 -3192  3193  677  3196 0

c  1-1 --> 0
c    (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0 ∧ -p_677) -> (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧ -b^{1, 678}_0)
c  in CNF:
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_2
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_1
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_0
c  in DIMACS:
 3191  3192 -3193  677 -3194 0
 3191  3192 -3193  677 -3195 0
 3191  3192 -3193  677 -3196 0

c  0-1 --> -1
c    (-b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧ -p_677) -> ( b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0)
c  in CNF:
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨  b^{1, 678}_2
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_1
c     b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨  b^{1, 678}_0
c  in DIMACS:
 3191  3192  3193  677  3194 0
 3191  3192  3193  677 -3195 0
 3191  3192  3193  677  3196 0

c  -1-1 --> -2
c    ( b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧  b^{1, 677}_0 ∧ -p_677) -> ( b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0)
c  in CNF:
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨  b^{1, 678}_2
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨  b^{1, 678}_1
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨  p_677 ∨ -b^{1, 678}_0
c  in DIMACS:
-3191  3192 -3193  677  3194 0
-3191  3192 -3193  677  3195 0
-3191  3192 -3193  677 -3196 0

c  -2-1 --> break 
c    ( b^{1, 677}_2 ∧  b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧ -p_677) -> break
c  in CNF:
c    -b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨  b^{1, 677}_0 ∨  p_677 ∨ break
c  in DIMACS:
-3191 -3192  3193  677 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 677}_2 ∧ -b^{1, 677}_1 ∧ -b^{1, 677}_0 ∧ true) 
c  in CNF:
c    -b^{1, 677}_2 ∨  b^{1, 677}_1 ∨  b^{1, 677}_0 ∨ false 
c  in DIMACS:
-3191  3192  3193  0

c  3 does not represent an automaton state.
c    -(-b^{1, 677}_2 ∧  b^{1, 677}_1 ∧  b^{1, 677}_0 ∧ true) 
c  in CNF:
c     b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ false 
c  in DIMACS:
 3191 -3192 -3193  0
c  -3 does not represent an automaton state.
c    -( b^{1, 677}_2 ∧  b^{1, 677}_1 ∧  b^{1, 677}_0 ∧ true) 
c  in CNF:
c    -b^{1, 677}_2 ∨ -b^{1, 677}_1 ∨ -b^{1, 677}_0 ∨ false 
c  in DIMACS:
-3191 -3192 -3193  0

c i = 678
c  -2+1 --> -1
c    ( b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧  p_678) -> ( b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0)
c  in CNF:
c    -b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨  b^{1, 679}_2
c    -b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_1
c    -b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨  b^{1, 679}_0
c  in DIMACS:
-3194 -3195  3196 -678  3197 0
-3194 -3195  3196 -678 -3198 0
-3194 -3195  3196 -678  3199 0

c  -1+1 --> 0
c    ( b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0 ∧  p_678) -> (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧ -b^{1, 679}_0)
c  in CNF:
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_2
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_1
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_0
c  in DIMACS:
-3194  3195 -3196 -678 -3197 0
-3194  3195 -3196 -678 -3198 0
-3194  3195 -3196 -678 -3199 0

c  0+1 --> 1
c    (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧  p_678) -> (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0)
c  in CNF:
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_2
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_1
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨  b^{1, 679}_0
c  in DIMACS:
 3194  3195  3196 -678 -3197 0
 3194  3195  3196 -678 -3198 0
 3194  3195  3196 -678  3199 0

c  1+1 --> 2
c    (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0 ∧  p_678) -> (-b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0)
c  in CNF:
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_2
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨  b^{1, 679}_1
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ -p_678 ∨ -b^{1, 679}_0
c  in DIMACS:
 3194  3195 -3196 -678 -3197 0
 3194  3195 -3196 -678  3198 0
 3194  3195 -3196 -678 -3199 0

c  2+1 --> break 
c    (-b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧  p_678) -> break
c  in CNF:
c     b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 3194 -3195  3196 -678 1162 0


c  2-1 --> 1
c    (-b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧ -p_678) -> (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0)
c  in CNF:
c     b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_2
c     b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_1
c     b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨  b^{1, 679}_0
c  in DIMACS:
 3194 -3195  3196  678 -3197 0
 3194 -3195  3196  678 -3198 0
 3194 -3195  3196  678  3199 0

c  1-1 --> 0
c    (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0 ∧ -p_678) -> (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧ -b^{1, 679}_0)
c  in CNF:
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_2
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_1
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_0
c  in DIMACS:
 3194  3195 -3196  678 -3197 0
 3194  3195 -3196  678 -3198 0
 3194  3195 -3196  678 -3199 0

c  0-1 --> -1
c    (-b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧ -p_678) -> ( b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0)
c  in CNF:
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨  b^{1, 679}_2
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_1
c     b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨  b^{1, 679}_0
c  in DIMACS:
 3194  3195  3196  678  3197 0
 3194  3195  3196  678 -3198 0
 3194  3195  3196  678  3199 0

c  -1-1 --> -2
c    ( b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧  b^{1, 678}_0 ∧ -p_678) -> ( b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0)
c  in CNF:
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨  b^{1, 679}_2
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨  b^{1, 679}_1
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨  p_678 ∨ -b^{1, 679}_0
c  in DIMACS:
-3194  3195 -3196  678  3197 0
-3194  3195 -3196  678  3198 0
-3194  3195 -3196  678 -3199 0

c  -2-1 --> break 
c    ( b^{1, 678}_2 ∧  b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨  b^{1, 678}_0 ∨  p_678 ∨ break
c  in DIMACS:
-3194 -3195  3196  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 678}_2 ∧ -b^{1, 678}_1 ∧ -b^{1, 678}_0 ∧ true) 
c  in CNF:
c    -b^{1, 678}_2 ∨  b^{1, 678}_1 ∨  b^{1, 678}_0 ∨ false 
c  in DIMACS:
-3194  3195  3196  0

c  3 does not represent an automaton state.
c    -(-b^{1, 678}_2 ∧  b^{1, 678}_1 ∧  b^{1, 678}_0 ∧ true) 
c  in CNF:
c     b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ false 
c  in DIMACS:
 3194 -3195 -3196  0
c  -3 does not represent an automaton state.
c    -( b^{1, 678}_2 ∧  b^{1, 678}_1 ∧  b^{1, 678}_0 ∧ true) 
c  in CNF:
c    -b^{1, 678}_2 ∨ -b^{1, 678}_1 ∨ -b^{1, 678}_0 ∨ false 
c  in DIMACS:
-3194 -3195 -3196  0

c i = 679
c  -2+1 --> -1
c    ( b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧  p_679) -> ( b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0)
c  in CNF:
c    -b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨  b^{1, 680}_2
c    -b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_1
c    -b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨  b^{1, 680}_0
c  in DIMACS:
-3197 -3198  3199 -679  3200 0
-3197 -3198  3199 -679 -3201 0
-3197 -3198  3199 -679  3202 0

c  -1+1 --> 0
c    ( b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0 ∧  p_679) -> (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧ -b^{1, 680}_0)
c  in CNF:
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_2
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_1
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_0
c  in DIMACS:
-3197  3198 -3199 -679 -3200 0
-3197  3198 -3199 -679 -3201 0
-3197  3198 -3199 -679 -3202 0

c  0+1 --> 1
c    (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧  p_679) -> (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0)
c  in CNF:
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_2
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_1
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨  b^{1, 680}_0
c  in DIMACS:
 3197  3198  3199 -679 -3200 0
 3197  3198  3199 -679 -3201 0
 3197  3198  3199 -679  3202 0

c  1+1 --> 2
c    (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0 ∧  p_679) -> (-b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0)
c  in CNF:
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_2
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨  b^{1, 680}_1
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ -p_679 ∨ -b^{1, 680}_0
c  in DIMACS:
 3197  3198 -3199 -679 -3200 0
 3197  3198 -3199 -679  3201 0
 3197  3198 -3199 -679 -3202 0

c  2+1 --> break 
c    (-b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧  p_679) -> break
c  in CNF:
c     b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ -p_679 ∨ break
c  in DIMACS:
 3197 -3198  3199 -679 1162 0


c  2-1 --> 1
c    (-b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧ -p_679) -> (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0)
c  in CNF:
c     b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_2
c     b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_1
c     b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨  b^{1, 680}_0
c  in DIMACS:
 3197 -3198  3199  679 -3200 0
 3197 -3198  3199  679 -3201 0
 3197 -3198  3199  679  3202 0

c  1-1 --> 0
c    (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0 ∧ -p_679) -> (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧ -b^{1, 680}_0)
c  in CNF:
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_2
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_1
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_0
c  in DIMACS:
 3197  3198 -3199  679 -3200 0
 3197  3198 -3199  679 -3201 0
 3197  3198 -3199  679 -3202 0

c  0-1 --> -1
c    (-b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧ -p_679) -> ( b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0)
c  in CNF:
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨  b^{1, 680}_2
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_1
c     b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨  b^{1, 680}_0
c  in DIMACS:
 3197  3198  3199  679  3200 0
 3197  3198  3199  679 -3201 0
 3197  3198  3199  679  3202 0

c  -1-1 --> -2
c    ( b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧  b^{1, 679}_0 ∧ -p_679) -> ( b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0)
c  in CNF:
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨  b^{1, 680}_2
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨  b^{1, 680}_1
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨  p_679 ∨ -b^{1, 680}_0
c  in DIMACS:
-3197  3198 -3199  679  3200 0
-3197  3198 -3199  679  3201 0
-3197  3198 -3199  679 -3202 0

c  -2-1 --> break 
c    ( b^{1, 679}_2 ∧  b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧ -p_679) -> break
c  in CNF:
c    -b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨  b^{1, 679}_0 ∨  p_679 ∨ break
c  in DIMACS:
-3197 -3198  3199  679 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 679}_2 ∧ -b^{1, 679}_1 ∧ -b^{1, 679}_0 ∧ true) 
c  in CNF:
c    -b^{1, 679}_2 ∨  b^{1, 679}_1 ∨  b^{1, 679}_0 ∨ false 
c  in DIMACS:
-3197  3198  3199  0

c  3 does not represent an automaton state.
c    -(-b^{1, 679}_2 ∧  b^{1, 679}_1 ∧  b^{1, 679}_0 ∧ true) 
c  in CNF:
c     b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ false 
c  in DIMACS:
 3197 -3198 -3199  0
c  -3 does not represent an automaton state.
c    -( b^{1, 679}_2 ∧  b^{1, 679}_1 ∧  b^{1, 679}_0 ∧ true) 
c  in CNF:
c    -b^{1, 679}_2 ∨ -b^{1, 679}_1 ∨ -b^{1, 679}_0 ∨ false 
c  in DIMACS:
-3197 -3198 -3199  0

c i = 680
c  -2+1 --> -1
c    ( b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧  p_680) -> ( b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0)
c  in CNF:
c    -b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨  b^{1, 681}_2
c    -b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_1
c    -b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨  b^{1, 681}_0
c  in DIMACS:
-3200 -3201  3202 -680  3203 0
-3200 -3201  3202 -680 -3204 0
-3200 -3201  3202 -680  3205 0

c  -1+1 --> 0
c    ( b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0 ∧  p_680) -> (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧ -b^{1, 681}_0)
c  in CNF:
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_2
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_1
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_0
c  in DIMACS:
-3200  3201 -3202 -680 -3203 0
-3200  3201 -3202 -680 -3204 0
-3200  3201 -3202 -680 -3205 0

c  0+1 --> 1
c    (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧  p_680) -> (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0)
c  in CNF:
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_2
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_1
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨  b^{1, 681}_0
c  in DIMACS:
 3200  3201  3202 -680 -3203 0
 3200  3201  3202 -680 -3204 0
 3200  3201  3202 -680  3205 0

c  1+1 --> 2
c    (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0 ∧  p_680) -> (-b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0)
c  in CNF:
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_2
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨  b^{1, 681}_1
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ -p_680 ∨ -b^{1, 681}_0
c  in DIMACS:
 3200  3201 -3202 -680 -3203 0
 3200  3201 -3202 -680  3204 0
 3200  3201 -3202 -680 -3205 0

c  2+1 --> break 
c    (-b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧  p_680) -> break
c  in CNF:
c     b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 3200 -3201  3202 -680 1162 0


c  2-1 --> 1
c    (-b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧ -p_680) -> (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0)
c  in CNF:
c     b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_2
c     b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_1
c     b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨  b^{1, 681}_0
c  in DIMACS:
 3200 -3201  3202  680 -3203 0
 3200 -3201  3202  680 -3204 0
 3200 -3201  3202  680  3205 0

c  1-1 --> 0
c    (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0 ∧ -p_680) -> (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧ -b^{1, 681}_0)
c  in CNF:
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_2
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_1
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_0
c  in DIMACS:
 3200  3201 -3202  680 -3203 0
 3200  3201 -3202  680 -3204 0
 3200  3201 -3202  680 -3205 0

c  0-1 --> -1
c    (-b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧ -p_680) -> ( b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0)
c  in CNF:
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨  b^{1, 681}_2
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_1
c     b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨  b^{1, 681}_0
c  in DIMACS:
 3200  3201  3202  680  3203 0
 3200  3201  3202  680 -3204 0
 3200  3201  3202  680  3205 0

c  -1-1 --> -2
c    ( b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧  b^{1, 680}_0 ∧ -p_680) -> ( b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0)
c  in CNF:
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨  b^{1, 681}_2
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨  b^{1, 681}_1
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨  p_680 ∨ -b^{1, 681}_0
c  in DIMACS:
-3200  3201 -3202  680  3203 0
-3200  3201 -3202  680  3204 0
-3200  3201 -3202  680 -3205 0

c  -2-1 --> break 
c    ( b^{1, 680}_2 ∧  b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨  b^{1, 680}_0 ∨  p_680 ∨ break
c  in DIMACS:
-3200 -3201  3202  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 680}_2 ∧ -b^{1, 680}_1 ∧ -b^{1, 680}_0 ∧ true) 
c  in CNF:
c    -b^{1, 680}_2 ∨  b^{1, 680}_1 ∨  b^{1, 680}_0 ∨ false 
c  in DIMACS:
-3200  3201  3202  0

c  3 does not represent an automaton state.
c    -(-b^{1, 680}_2 ∧  b^{1, 680}_1 ∧  b^{1, 680}_0 ∧ true) 
c  in CNF:
c     b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ false 
c  in DIMACS:
 3200 -3201 -3202  0
c  -3 does not represent an automaton state.
c    -( b^{1, 680}_2 ∧  b^{1, 680}_1 ∧  b^{1, 680}_0 ∧ true) 
c  in CNF:
c    -b^{1, 680}_2 ∨ -b^{1, 680}_1 ∨ -b^{1, 680}_0 ∨ false 
c  in DIMACS:
-3200 -3201 -3202  0

c i = 681
c  -2+1 --> -1
c    ( b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧  p_681) -> ( b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0)
c  in CNF:
c    -b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨  b^{1, 682}_2
c    -b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_1
c    -b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨  b^{1, 682}_0
c  in DIMACS:
-3203 -3204  3205 -681  3206 0
-3203 -3204  3205 -681 -3207 0
-3203 -3204  3205 -681  3208 0

c  -1+1 --> 0
c    ( b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0 ∧  p_681) -> (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧ -b^{1, 682}_0)
c  in CNF:
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_2
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_1
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_0
c  in DIMACS:
-3203  3204 -3205 -681 -3206 0
-3203  3204 -3205 -681 -3207 0
-3203  3204 -3205 -681 -3208 0

c  0+1 --> 1
c    (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧  p_681) -> (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0)
c  in CNF:
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_2
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_1
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨  b^{1, 682}_0
c  in DIMACS:
 3203  3204  3205 -681 -3206 0
 3203  3204  3205 -681 -3207 0
 3203  3204  3205 -681  3208 0

c  1+1 --> 2
c    (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0 ∧  p_681) -> (-b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0)
c  in CNF:
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_2
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨  b^{1, 682}_1
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ -p_681 ∨ -b^{1, 682}_0
c  in DIMACS:
 3203  3204 -3205 -681 -3206 0
 3203  3204 -3205 -681  3207 0
 3203  3204 -3205 -681 -3208 0

c  2+1 --> break 
c    (-b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧  p_681) -> break
c  in CNF:
c     b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ -p_681 ∨ break
c  in DIMACS:
 3203 -3204  3205 -681 1162 0


c  2-1 --> 1
c    (-b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧ -p_681) -> (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0)
c  in CNF:
c     b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_2
c     b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_1
c     b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨  b^{1, 682}_0
c  in DIMACS:
 3203 -3204  3205  681 -3206 0
 3203 -3204  3205  681 -3207 0
 3203 -3204  3205  681  3208 0

c  1-1 --> 0
c    (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0 ∧ -p_681) -> (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧ -b^{1, 682}_0)
c  in CNF:
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_2
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_1
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_0
c  in DIMACS:
 3203  3204 -3205  681 -3206 0
 3203  3204 -3205  681 -3207 0
 3203  3204 -3205  681 -3208 0

c  0-1 --> -1
c    (-b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧ -p_681) -> ( b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0)
c  in CNF:
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨  b^{1, 682}_2
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_1
c     b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨  b^{1, 682}_0
c  in DIMACS:
 3203  3204  3205  681  3206 0
 3203  3204  3205  681 -3207 0
 3203  3204  3205  681  3208 0

c  -1-1 --> -2
c    ( b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧  b^{1, 681}_0 ∧ -p_681) -> ( b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0)
c  in CNF:
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨  b^{1, 682}_2
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨  b^{1, 682}_1
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨  p_681 ∨ -b^{1, 682}_0
c  in DIMACS:
-3203  3204 -3205  681  3206 0
-3203  3204 -3205  681  3207 0
-3203  3204 -3205  681 -3208 0

c  -2-1 --> break 
c    ( b^{1, 681}_2 ∧  b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧ -p_681) -> break
c  in CNF:
c    -b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨  b^{1, 681}_0 ∨  p_681 ∨ break
c  in DIMACS:
-3203 -3204  3205  681 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 681}_2 ∧ -b^{1, 681}_1 ∧ -b^{1, 681}_0 ∧ true) 
c  in CNF:
c    -b^{1, 681}_2 ∨  b^{1, 681}_1 ∨  b^{1, 681}_0 ∨ false 
c  in DIMACS:
-3203  3204  3205  0

c  3 does not represent an automaton state.
c    -(-b^{1, 681}_2 ∧  b^{1, 681}_1 ∧  b^{1, 681}_0 ∧ true) 
c  in CNF:
c     b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ false 
c  in DIMACS:
 3203 -3204 -3205  0
c  -3 does not represent an automaton state.
c    -( b^{1, 681}_2 ∧  b^{1, 681}_1 ∧  b^{1, 681}_0 ∧ true) 
c  in CNF:
c    -b^{1, 681}_2 ∨ -b^{1, 681}_1 ∨ -b^{1, 681}_0 ∨ false 
c  in DIMACS:
-3203 -3204 -3205  0

c i = 682
c  -2+1 --> -1
c    ( b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧  p_682) -> ( b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0)
c  in CNF:
c    -b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨  b^{1, 683}_2
c    -b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_1
c    -b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨  b^{1, 683}_0
c  in DIMACS:
-3206 -3207  3208 -682  3209 0
-3206 -3207  3208 -682 -3210 0
-3206 -3207  3208 -682  3211 0

c  -1+1 --> 0
c    ( b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0 ∧  p_682) -> (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧ -b^{1, 683}_0)
c  in CNF:
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_2
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_1
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_0
c  in DIMACS:
-3206  3207 -3208 -682 -3209 0
-3206  3207 -3208 -682 -3210 0
-3206  3207 -3208 -682 -3211 0

c  0+1 --> 1
c    (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧  p_682) -> (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0)
c  in CNF:
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_2
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_1
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨  b^{1, 683}_0
c  in DIMACS:
 3206  3207  3208 -682 -3209 0
 3206  3207  3208 -682 -3210 0
 3206  3207  3208 -682  3211 0

c  1+1 --> 2
c    (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0 ∧  p_682) -> (-b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0)
c  in CNF:
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_2
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨  b^{1, 683}_1
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ -p_682 ∨ -b^{1, 683}_0
c  in DIMACS:
 3206  3207 -3208 -682 -3209 0
 3206  3207 -3208 -682  3210 0
 3206  3207 -3208 -682 -3211 0

c  2+1 --> break 
c    (-b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧  p_682) -> break
c  in CNF:
c     b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 3206 -3207  3208 -682 1162 0


c  2-1 --> 1
c    (-b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧ -p_682) -> (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0)
c  in CNF:
c     b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_2
c     b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_1
c     b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨  b^{1, 683}_0
c  in DIMACS:
 3206 -3207  3208  682 -3209 0
 3206 -3207  3208  682 -3210 0
 3206 -3207  3208  682  3211 0

c  1-1 --> 0
c    (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0 ∧ -p_682) -> (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧ -b^{1, 683}_0)
c  in CNF:
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_2
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_1
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_0
c  in DIMACS:
 3206  3207 -3208  682 -3209 0
 3206  3207 -3208  682 -3210 0
 3206  3207 -3208  682 -3211 0

c  0-1 --> -1
c    (-b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧ -p_682) -> ( b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0)
c  in CNF:
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨  b^{1, 683}_2
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_1
c     b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨  b^{1, 683}_0
c  in DIMACS:
 3206  3207  3208  682  3209 0
 3206  3207  3208  682 -3210 0
 3206  3207  3208  682  3211 0

c  -1-1 --> -2
c    ( b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧  b^{1, 682}_0 ∧ -p_682) -> ( b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0)
c  in CNF:
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨  b^{1, 683}_2
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨  b^{1, 683}_1
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨  p_682 ∨ -b^{1, 683}_0
c  in DIMACS:
-3206  3207 -3208  682  3209 0
-3206  3207 -3208  682  3210 0
-3206  3207 -3208  682 -3211 0

c  -2-1 --> break 
c    ( b^{1, 682}_2 ∧  b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨  b^{1, 682}_0 ∨  p_682 ∨ break
c  in DIMACS:
-3206 -3207  3208  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 682}_2 ∧ -b^{1, 682}_1 ∧ -b^{1, 682}_0 ∧ true) 
c  in CNF:
c    -b^{1, 682}_2 ∨  b^{1, 682}_1 ∨  b^{1, 682}_0 ∨ false 
c  in DIMACS:
-3206  3207  3208  0

c  3 does not represent an automaton state.
c    -(-b^{1, 682}_2 ∧  b^{1, 682}_1 ∧  b^{1, 682}_0 ∧ true) 
c  in CNF:
c     b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ false 
c  in DIMACS:
 3206 -3207 -3208  0
c  -3 does not represent an automaton state.
c    -( b^{1, 682}_2 ∧  b^{1, 682}_1 ∧  b^{1, 682}_0 ∧ true) 
c  in CNF:
c    -b^{1, 682}_2 ∨ -b^{1, 682}_1 ∨ -b^{1, 682}_0 ∨ false 
c  in DIMACS:
-3206 -3207 -3208  0

c i = 683
c  -2+1 --> -1
c    ( b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧  p_683) -> ( b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0)
c  in CNF:
c    -b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨  b^{1, 684}_2
c    -b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_1
c    -b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨  b^{1, 684}_0
c  in DIMACS:
-3209 -3210  3211 -683  3212 0
-3209 -3210  3211 -683 -3213 0
-3209 -3210  3211 -683  3214 0

c  -1+1 --> 0
c    ( b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0 ∧  p_683) -> (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧ -b^{1, 684}_0)
c  in CNF:
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_2
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_1
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_0
c  in DIMACS:
-3209  3210 -3211 -683 -3212 0
-3209  3210 -3211 -683 -3213 0
-3209  3210 -3211 -683 -3214 0

c  0+1 --> 1
c    (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧  p_683) -> (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0)
c  in CNF:
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_2
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_1
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨  b^{1, 684}_0
c  in DIMACS:
 3209  3210  3211 -683 -3212 0
 3209  3210  3211 -683 -3213 0
 3209  3210  3211 -683  3214 0

c  1+1 --> 2
c    (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0 ∧  p_683) -> (-b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0)
c  in CNF:
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_2
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨  b^{1, 684}_1
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ -p_683 ∨ -b^{1, 684}_0
c  in DIMACS:
 3209  3210 -3211 -683 -3212 0
 3209  3210 -3211 -683  3213 0
 3209  3210 -3211 -683 -3214 0

c  2+1 --> break 
c    (-b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧  p_683) -> break
c  in CNF:
c     b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ -p_683 ∨ break
c  in DIMACS:
 3209 -3210  3211 -683 1162 0


c  2-1 --> 1
c    (-b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧ -p_683) -> (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0)
c  in CNF:
c     b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_2
c     b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_1
c     b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨  b^{1, 684}_0
c  in DIMACS:
 3209 -3210  3211  683 -3212 0
 3209 -3210  3211  683 -3213 0
 3209 -3210  3211  683  3214 0

c  1-1 --> 0
c    (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0 ∧ -p_683) -> (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧ -b^{1, 684}_0)
c  in CNF:
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_2
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_1
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_0
c  in DIMACS:
 3209  3210 -3211  683 -3212 0
 3209  3210 -3211  683 -3213 0
 3209  3210 -3211  683 -3214 0

c  0-1 --> -1
c    (-b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧ -p_683) -> ( b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0)
c  in CNF:
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨  b^{1, 684}_2
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_1
c     b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨  b^{1, 684}_0
c  in DIMACS:
 3209  3210  3211  683  3212 0
 3209  3210  3211  683 -3213 0
 3209  3210  3211  683  3214 0

c  -1-1 --> -2
c    ( b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧  b^{1, 683}_0 ∧ -p_683) -> ( b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0)
c  in CNF:
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨  b^{1, 684}_2
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨  b^{1, 684}_1
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨  p_683 ∨ -b^{1, 684}_0
c  in DIMACS:
-3209  3210 -3211  683  3212 0
-3209  3210 -3211  683  3213 0
-3209  3210 -3211  683 -3214 0

c  -2-1 --> break 
c    ( b^{1, 683}_2 ∧  b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧ -p_683) -> break
c  in CNF:
c    -b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨  b^{1, 683}_0 ∨  p_683 ∨ break
c  in DIMACS:
-3209 -3210  3211  683 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 683}_2 ∧ -b^{1, 683}_1 ∧ -b^{1, 683}_0 ∧ true) 
c  in CNF:
c    -b^{1, 683}_2 ∨  b^{1, 683}_1 ∨  b^{1, 683}_0 ∨ false 
c  in DIMACS:
-3209  3210  3211  0

c  3 does not represent an automaton state.
c    -(-b^{1, 683}_2 ∧  b^{1, 683}_1 ∧  b^{1, 683}_0 ∧ true) 
c  in CNF:
c     b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ false 
c  in DIMACS:
 3209 -3210 -3211  0
c  -3 does not represent an automaton state.
c    -( b^{1, 683}_2 ∧  b^{1, 683}_1 ∧  b^{1, 683}_0 ∧ true) 
c  in CNF:
c    -b^{1, 683}_2 ∨ -b^{1, 683}_1 ∨ -b^{1, 683}_0 ∨ false 
c  in DIMACS:
-3209 -3210 -3211  0

c i = 684
c  -2+1 --> -1
c    ( b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧  p_684) -> ( b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0)
c  in CNF:
c    -b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨  b^{1, 685}_2
c    -b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_1
c    -b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨  b^{1, 685}_0
c  in DIMACS:
-3212 -3213  3214 -684  3215 0
-3212 -3213  3214 -684 -3216 0
-3212 -3213  3214 -684  3217 0

c  -1+1 --> 0
c    ( b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0 ∧  p_684) -> (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧ -b^{1, 685}_0)
c  in CNF:
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_2
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_1
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_0
c  in DIMACS:
-3212  3213 -3214 -684 -3215 0
-3212  3213 -3214 -684 -3216 0
-3212  3213 -3214 -684 -3217 0

c  0+1 --> 1
c    (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧  p_684) -> (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0)
c  in CNF:
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_2
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_1
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨  b^{1, 685}_0
c  in DIMACS:
 3212  3213  3214 -684 -3215 0
 3212  3213  3214 -684 -3216 0
 3212  3213  3214 -684  3217 0

c  1+1 --> 2
c    (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0 ∧  p_684) -> (-b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0)
c  in CNF:
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_2
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨  b^{1, 685}_1
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ -p_684 ∨ -b^{1, 685}_0
c  in DIMACS:
 3212  3213 -3214 -684 -3215 0
 3212  3213 -3214 -684  3216 0
 3212  3213 -3214 -684 -3217 0

c  2+1 --> break 
c    (-b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧  p_684) -> break
c  in CNF:
c     b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 3212 -3213  3214 -684 1162 0


c  2-1 --> 1
c    (-b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧ -p_684) -> (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0)
c  in CNF:
c     b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_2
c     b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_1
c     b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨  b^{1, 685}_0
c  in DIMACS:
 3212 -3213  3214  684 -3215 0
 3212 -3213  3214  684 -3216 0
 3212 -3213  3214  684  3217 0

c  1-1 --> 0
c    (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0 ∧ -p_684) -> (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧ -b^{1, 685}_0)
c  in CNF:
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_2
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_1
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_0
c  in DIMACS:
 3212  3213 -3214  684 -3215 0
 3212  3213 -3214  684 -3216 0
 3212  3213 -3214  684 -3217 0

c  0-1 --> -1
c    (-b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧ -p_684) -> ( b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0)
c  in CNF:
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨  b^{1, 685}_2
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_1
c     b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨  b^{1, 685}_0
c  in DIMACS:
 3212  3213  3214  684  3215 0
 3212  3213  3214  684 -3216 0
 3212  3213  3214  684  3217 0

c  -1-1 --> -2
c    ( b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧  b^{1, 684}_0 ∧ -p_684) -> ( b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0)
c  in CNF:
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨  b^{1, 685}_2
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨  b^{1, 685}_1
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨  p_684 ∨ -b^{1, 685}_0
c  in DIMACS:
-3212  3213 -3214  684  3215 0
-3212  3213 -3214  684  3216 0
-3212  3213 -3214  684 -3217 0

c  -2-1 --> break 
c    ( b^{1, 684}_2 ∧  b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨  b^{1, 684}_0 ∨  p_684 ∨ break
c  in DIMACS:
-3212 -3213  3214  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 684}_2 ∧ -b^{1, 684}_1 ∧ -b^{1, 684}_0 ∧ true) 
c  in CNF:
c    -b^{1, 684}_2 ∨  b^{1, 684}_1 ∨  b^{1, 684}_0 ∨ false 
c  in DIMACS:
-3212  3213  3214  0

c  3 does not represent an automaton state.
c    -(-b^{1, 684}_2 ∧  b^{1, 684}_1 ∧  b^{1, 684}_0 ∧ true) 
c  in CNF:
c     b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ false 
c  in DIMACS:
 3212 -3213 -3214  0
c  -3 does not represent an automaton state.
c    -( b^{1, 684}_2 ∧  b^{1, 684}_1 ∧  b^{1, 684}_0 ∧ true) 
c  in CNF:
c    -b^{1, 684}_2 ∨ -b^{1, 684}_1 ∨ -b^{1, 684}_0 ∨ false 
c  in DIMACS:
-3212 -3213 -3214  0

c i = 685
c  -2+1 --> -1
c    ( b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧  p_685) -> ( b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0)
c  in CNF:
c    -b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨  b^{1, 686}_2
c    -b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_1
c    -b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨  b^{1, 686}_0
c  in DIMACS:
-3215 -3216  3217 -685  3218 0
-3215 -3216  3217 -685 -3219 0
-3215 -3216  3217 -685  3220 0

c  -1+1 --> 0
c    ( b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0 ∧  p_685) -> (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧ -b^{1, 686}_0)
c  in CNF:
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_2
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_1
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_0
c  in DIMACS:
-3215  3216 -3217 -685 -3218 0
-3215  3216 -3217 -685 -3219 0
-3215  3216 -3217 -685 -3220 0

c  0+1 --> 1
c    (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧  p_685) -> (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0)
c  in CNF:
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_2
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_1
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨  b^{1, 686}_0
c  in DIMACS:
 3215  3216  3217 -685 -3218 0
 3215  3216  3217 -685 -3219 0
 3215  3216  3217 -685  3220 0

c  1+1 --> 2
c    (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0 ∧  p_685) -> (-b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0)
c  in CNF:
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_2
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨  b^{1, 686}_1
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ -p_685 ∨ -b^{1, 686}_0
c  in DIMACS:
 3215  3216 -3217 -685 -3218 0
 3215  3216 -3217 -685  3219 0
 3215  3216 -3217 -685 -3220 0

c  2+1 --> break 
c    (-b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧  p_685) -> break
c  in CNF:
c     b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ -p_685 ∨ break
c  in DIMACS:
 3215 -3216  3217 -685 1162 0


c  2-1 --> 1
c    (-b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧ -p_685) -> (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0)
c  in CNF:
c     b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_2
c     b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_1
c     b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨  b^{1, 686}_0
c  in DIMACS:
 3215 -3216  3217  685 -3218 0
 3215 -3216  3217  685 -3219 0
 3215 -3216  3217  685  3220 0

c  1-1 --> 0
c    (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0 ∧ -p_685) -> (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧ -b^{1, 686}_0)
c  in CNF:
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_2
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_1
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_0
c  in DIMACS:
 3215  3216 -3217  685 -3218 0
 3215  3216 -3217  685 -3219 0
 3215  3216 -3217  685 -3220 0

c  0-1 --> -1
c    (-b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧ -p_685) -> ( b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0)
c  in CNF:
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨  b^{1, 686}_2
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_1
c     b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨  b^{1, 686}_0
c  in DIMACS:
 3215  3216  3217  685  3218 0
 3215  3216  3217  685 -3219 0
 3215  3216  3217  685  3220 0

c  -1-1 --> -2
c    ( b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧  b^{1, 685}_0 ∧ -p_685) -> ( b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0)
c  in CNF:
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨  b^{1, 686}_2
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨  b^{1, 686}_1
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨  p_685 ∨ -b^{1, 686}_0
c  in DIMACS:
-3215  3216 -3217  685  3218 0
-3215  3216 -3217  685  3219 0
-3215  3216 -3217  685 -3220 0

c  -2-1 --> break 
c    ( b^{1, 685}_2 ∧  b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧ -p_685) -> break
c  in CNF:
c    -b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨  b^{1, 685}_0 ∨  p_685 ∨ break
c  in DIMACS:
-3215 -3216  3217  685 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 685}_2 ∧ -b^{1, 685}_1 ∧ -b^{1, 685}_0 ∧ true) 
c  in CNF:
c    -b^{1, 685}_2 ∨  b^{1, 685}_1 ∨  b^{1, 685}_0 ∨ false 
c  in DIMACS:
-3215  3216  3217  0

c  3 does not represent an automaton state.
c    -(-b^{1, 685}_2 ∧  b^{1, 685}_1 ∧  b^{1, 685}_0 ∧ true) 
c  in CNF:
c     b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ false 
c  in DIMACS:
 3215 -3216 -3217  0
c  -3 does not represent an automaton state.
c    -( b^{1, 685}_2 ∧  b^{1, 685}_1 ∧  b^{1, 685}_0 ∧ true) 
c  in CNF:
c    -b^{1, 685}_2 ∨ -b^{1, 685}_1 ∨ -b^{1, 685}_0 ∨ false 
c  in DIMACS:
-3215 -3216 -3217  0

c i = 686
c  -2+1 --> -1
c    ( b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧  p_686) -> ( b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0)
c  in CNF:
c    -b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨  b^{1, 687}_2
c    -b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_1
c    -b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨  b^{1, 687}_0
c  in DIMACS:
-3218 -3219  3220 -686  3221 0
-3218 -3219  3220 -686 -3222 0
-3218 -3219  3220 -686  3223 0

c  -1+1 --> 0
c    ( b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0 ∧  p_686) -> (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧ -b^{1, 687}_0)
c  in CNF:
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_2
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_1
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_0
c  in DIMACS:
-3218  3219 -3220 -686 -3221 0
-3218  3219 -3220 -686 -3222 0
-3218  3219 -3220 -686 -3223 0

c  0+1 --> 1
c    (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧  p_686) -> (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0)
c  in CNF:
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_2
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_1
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨  b^{1, 687}_0
c  in DIMACS:
 3218  3219  3220 -686 -3221 0
 3218  3219  3220 -686 -3222 0
 3218  3219  3220 -686  3223 0

c  1+1 --> 2
c    (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0 ∧  p_686) -> (-b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0)
c  in CNF:
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_2
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨  b^{1, 687}_1
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ -p_686 ∨ -b^{1, 687}_0
c  in DIMACS:
 3218  3219 -3220 -686 -3221 0
 3218  3219 -3220 -686  3222 0
 3218  3219 -3220 -686 -3223 0

c  2+1 --> break 
c    (-b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧  p_686) -> break
c  in CNF:
c     b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 3218 -3219  3220 -686 1162 0


c  2-1 --> 1
c    (-b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧ -p_686) -> (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0)
c  in CNF:
c     b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_2
c     b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_1
c     b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨  b^{1, 687}_0
c  in DIMACS:
 3218 -3219  3220  686 -3221 0
 3218 -3219  3220  686 -3222 0
 3218 -3219  3220  686  3223 0

c  1-1 --> 0
c    (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0 ∧ -p_686) -> (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧ -b^{1, 687}_0)
c  in CNF:
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_2
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_1
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_0
c  in DIMACS:
 3218  3219 -3220  686 -3221 0
 3218  3219 -3220  686 -3222 0
 3218  3219 -3220  686 -3223 0

c  0-1 --> -1
c    (-b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧ -p_686) -> ( b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0)
c  in CNF:
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨  b^{1, 687}_2
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_1
c     b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨  b^{1, 687}_0
c  in DIMACS:
 3218  3219  3220  686  3221 0
 3218  3219  3220  686 -3222 0
 3218  3219  3220  686  3223 0

c  -1-1 --> -2
c    ( b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧  b^{1, 686}_0 ∧ -p_686) -> ( b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0)
c  in CNF:
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨  b^{1, 687}_2
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨  b^{1, 687}_1
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨  p_686 ∨ -b^{1, 687}_0
c  in DIMACS:
-3218  3219 -3220  686  3221 0
-3218  3219 -3220  686  3222 0
-3218  3219 -3220  686 -3223 0

c  -2-1 --> break 
c    ( b^{1, 686}_2 ∧  b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨  b^{1, 686}_0 ∨  p_686 ∨ break
c  in DIMACS:
-3218 -3219  3220  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 686}_2 ∧ -b^{1, 686}_1 ∧ -b^{1, 686}_0 ∧ true) 
c  in CNF:
c    -b^{1, 686}_2 ∨  b^{1, 686}_1 ∨  b^{1, 686}_0 ∨ false 
c  in DIMACS:
-3218  3219  3220  0

c  3 does not represent an automaton state.
c    -(-b^{1, 686}_2 ∧  b^{1, 686}_1 ∧  b^{1, 686}_0 ∧ true) 
c  in CNF:
c     b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ false 
c  in DIMACS:
 3218 -3219 -3220  0
c  -3 does not represent an automaton state.
c    -( b^{1, 686}_2 ∧  b^{1, 686}_1 ∧  b^{1, 686}_0 ∧ true) 
c  in CNF:
c    -b^{1, 686}_2 ∨ -b^{1, 686}_1 ∨ -b^{1, 686}_0 ∨ false 
c  in DIMACS:
-3218 -3219 -3220  0

c i = 687
c  -2+1 --> -1
c    ( b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧  p_687) -> ( b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0)
c  in CNF:
c    -b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨  b^{1, 688}_2
c    -b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_1
c    -b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨  b^{1, 688}_0
c  in DIMACS:
-3221 -3222  3223 -687  3224 0
-3221 -3222  3223 -687 -3225 0
-3221 -3222  3223 -687  3226 0

c  -1+1 --> 0
c    ( b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0 ∧  p_687) -> (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧ -b^{1, 688}_0)
c  in CNF:
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_2
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_1
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_0
c  in DIMACS:
-3221  3222 -3223 -687 -3224 0
-3221  3222 -3223 -687 -3225 0
-3221  3222 -3223 -687 -3226 0

c  0+1 --> 1
c    (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧  p_687) -> (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0)
c  in CNF:
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_2
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_1
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨  b^{1, 688}_0
c  in DIMACS:
 3221  3222  3223 -687 -3224 0
 3221  3222  3223 -687 -3225 0
 3221  3222  3223 -687  3226 0

c  1+1 --> 2
c    (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0 ∧  p_687) -> (-b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0)
c  in CNF:
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_2
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨  b^{1, 688}_1
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ -p_687 ∨ -b^{1, 688}_0
c  in DIMACS:
 3221  3222 -3223 -687 -3224 0
 3221  3222 -3223 -687  3225 0
 3221  3222 -3223 -687 -3226 0

c  2+1 --> break 
c    (-b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧  p_687) -> break
c  in CNF:
c     b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ -p_687 ∨ break
c  in DIMACS:
 3221 -3222  3223 -687 1162 0


c  2-1 --> 1
c    (-b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧ -p_687) -> (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0)
c  in CNF:
c     b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_2
c     b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_1
c     b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨  b^{1, 688}_0
c  in DIMACS:
 3221 -3222  3223  687 -3224 0
 3221 -3222  3223  687 -3225 0
 3221 -3222  3223  687  3226 0

c  1-1 --> 0
c    (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0 ∧ -p_687) -> (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧ -b^{1, 688}_0)
c  in CNF:
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_2
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_1
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_0
c  in DIMACS:
 3221  3222 -3223  687 -3224 0
 3221  3222 -3223  687 -3225 0
 3221  3222 -3223  687 -3226 0

c  0-1 --> -1
c    (-b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧ -p_687) -> ( b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0)
c  in CNF:
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨  b^{1, 688}_2
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_1
c     b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨  b^{1, 688}_0
c  in DIMACS:
 3221  3222  3223  687  3224 0
 3221  3222  3223  687 -3225 0
 3221  3222  3223  687  3226 0

c  -1-1 --> -2
c    ( b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧  b^{1, 687}_0 ∧ -p_687) -> ( b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0)
c  in CNF:
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨  b^{1, 688}_2
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨  b^{1, 688}_1
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨  p_687 ∨ -b^{1, 688}_0
c  in DIMACS:
-3221  3222 -3223  687  3224 0
-3221  3222 -3223  687  3225 0
-3221  3222 -3223  687 -3226 0

c  -2-1 --> break 
c    ( b^{1, 687}_2 ∧  b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧ -p_687) -> break
c  in CNF:
c    -b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨  b^{1, 687}_0 ∨  p_687 ∨ break
c  in DIMACS:
-3221 -3222  3223  687 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 687}_2 ∧ -b^{1, 687}_1 ∧ -b^{1, 687}_0 ∧ true) 
c  in CNF:
c    -b^{1, 687}_2 ∨  b^{1, 687}_1 ∨  b^{1, 687}_0 ∨ false 
c  in DIMACS:
-3221  3222  3223  0

c  3 does not represent an automaton state.
c    -(-b^{1, 687}_2 ∧  b^{1, 687}_1 ∧  b^{1, 687}_0 ∧ true) 
c  in CNF:
c     b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ false 
c  in DIMACS:
 3221 -3222 -3223  0
c  -3 does not represent an automaton state.
c    -( b^{1, 687}_2 ∧  b^{1, 687}_1 ∧  b^{1, 687}_0 ∧ true) 
c  in CNF:
c    -b^{1, 687}_2 ∨ -b^{1, 687}_1 ∨ -b^{1, 687}_0 ∨ false 
c  in DIMACS:
-3221 -3222 -3223  0

c i = 688
c  -2+1 --> -1
c    ( b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧  p_688) -> ( b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0)
c  in CNF:
c    -b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨  b^{1, 689}_2
c    -b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_1
c    -b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨  b^{1, 689}_0
c  in DIMACS:
-3224 -3225  3226 -688  3227 0
-3224 -3225  3226 -688 -3228 0
-3224 -3225  3226 -688  3229 0

c  -1+1 --> 0
c    ( b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0 ∧  p_688) -> (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧ -b^{1, 689}_0)
c  in CNF:
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_2
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_1
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_0
c  in DIMACS:
-3224  3225 -3226 -688 -3227 0
-3224  3225 -3226 -688 -3228 0
-3224  3225 -3226 -688 -3229 0

c  0+1 --> 1
c    (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧  p_688) -> (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0)
c  in CNF:
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_2
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_1
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨  b^{1, 689}_0
c  in DIMACS:
 3224  3225  3226 -688 -3227 0
 3224  3225  3226 -688 -3228 0
 3224  3225  3226 -688  3229 0

c  1+1 --> 2
c    (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0 ∧  p_688) -> (-b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0)
c  in CNF:
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_2
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨  b^{1, 689}_1
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ -p_688 ∨ -b^{1, 689}_0
c  in DIMACS:
 3224  3225 -3226 -688 -3227 0
 3224  3225 -3226 -688  3228 0
 3224  3225 -3226 -688 -3229 0

c  2+1 --> break 
c    (-b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧  p_688) -> break
c  in CNF:
c     b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 3224 -3225  3226 -688 1162 0


c  2-1 --> 1
c    (-b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧ -p_688) -> (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0)
c  in CNF:
c     b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_2
c     b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_1
c     b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨  b^{1, 689}_0
c  in DIMACS:
 3224 -3225  3226  688 -3227 0
 3224 -3225  3226  688 -3228 0
 3224 -3225  3226  688  3229 0

c  1-1 --> 0
c    (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0 ∧ -p_688) -> (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧ -b^{1, 689}_0)
c  in CNF:
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_2
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_1
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_0
c  in DIMACS:
 3224  3225 -3226  688 -3227 0
 3224  3225 -3226  688 -3228 0
 3224  3225 -3226  688 -3229 0

c  0-1 --> -1
c    (-b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧ -p_688) -> ( b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0)
c  in CNF:
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨  b^{1, 689}_2
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_1
c     b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨  b^{1, 689}_0
c  in DIMACS:
 3224  3225  3226  688  3227 0
 3224  3225  3226  688 -3228 0
 3224  3225  3226  688  3229 0

c  -1-1 --> -2
c    ( b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧  b^{1, 688}_0 ∧ -p_688) -> ( b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0)
c  in CNF:
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨  b^{1, 689}_2
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨  b^{1, 689}_1
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨  p_688 ∨ -b^{1, 689}_0
c  in DIMACS:
-3224  3225 -3226  688  3227 0
-3224  3225 -3226  688  3228 0
-3224  3225 -3226  688 -3229 0

c  -2-1 --> break 
c    ( b^{1, 688}_2 ∧  b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨  b^{1, 688}_0 ∨  p_688 ∨ break
c  in DIMACS:
-3224 -3225  3226  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 688}_2 ∧ -b^{1, 688}_1 ∧ -b^{1, 688}_0 ∧ true) 
c  in CNF:
c    -b^{1, 688}_2 ∨  b^{1, 688}_1 ∨  b^{1, 688}_0 ∨ false 
c  in DIMACS:
-3224  3225  3226  0

c  3 does not represent an automaton state.
c    -(-b^{1, 688}_2 ∧  b^{1, 688}_1 ∧  b^{1, 688}_0 ∧ true) 
c  in CNF:
c     b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ false 
c  in DIMACS:
 3224 -3225 -3226  0
c  -3 does not represent an automaton state.
c    -( b^{1, 688}_2 ∧  b^{1, 688}_1 ∧  b^{1, 688}_0 ∧ true) 
c  in CNF:
c    -b^{1, 688}_2 ∨ -b^{1, 688}_1 ∨ -b^{1, 688}_0 ∨ false 
c  in DIMACS:
-3224 -3225 -3226  0

c i = 689
c  -2+1 --> -1
c    ( b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧  p_689) -> ( b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0)
c  in CNF:
c    -b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨  b^{1, 690}_2
c    -b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_1
c    -b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨  b^{1, 690}_0
c  in DIMACS:
-3227 -3228  3229 -689  3230 0
-3227 -3228  3229 -689 -3231 0
-3227 -3228  3229 -689  3232 0

c  -1+1 --> 0
c    ( b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0 ∧  p_689) -> (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧ -b^{1, 690}_0)
c  in CNF:
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_2
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_1
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_0
c  in DIMACS:
-3227  3228 -3229 -689 -3230 0
-3227  3228 -3229 -689 -3231 0
-3227  3228 -3229 -689 -3232 0

c  0+1 --> 1
c    (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧  p_689) -> (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0)
c  in CNF:
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_2
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_1
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨  b^{1, 690}_0
c  in DIMACS:
 3227  3228  3229 -689 -3230 0
 3227  3228  3229 -689 -3231 0
 3227  3228  3229 -689  3232 0

c  1+1 --> 2
c    (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0 ∧  p_689) -> (-b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0)
c  in CNF:
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_2
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨  b^{1, 690}_1
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ -p_689 ∨ -b^{1, 690}_0
c  in DIMACS:
 3227  3228 -3229 -689 -3230 0
 3227  3228 -3229 -689  3231 0
 3227  3228 -3229 -689 -3232 0

c  2+1 --> break 
c    (-b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧  p_689) -> break
c  in CNF:
c     b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ -p_689 ∨ break
c  in DIMACS:
 3227 -3228  3229 -689 1162 0


c  2-1 --> 1
c    (-b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧ -p_689) -> (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0)
c  in CNF:
c     b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_2
c     b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_1
c     b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨  b^{1, 690}_0
c  in DIMACS:
 3227 -3228  3229  689 -3230 0
 3227 -3228  3229  689 -3231 0
 3227 -3228  3229  689  3232 0

c  1-1 --> 0
c    (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0 ∧ -p_689) -> (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧ -b^{1, 690}_0)
c  in CNF:
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_2
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_1
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_0
c  in DIMACS:
 3227  3228 -3229  689 -3230 0
 3227  3228 -3229  689 -3231 0
 3227  3228 -3229  689 -3232 0

c  0-1 --> -1
c    (-b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧ -p_689) -> ( b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0)
c  in CNF:
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨  b^{1, 690}_2
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_1
c     b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨  b^{1, 690}_0
c  in DIMACS:
 3227  3228  3229  689  3230 0
 3227  3228  3229  689 -3231 0
 3227  3228  3229  689  3232 0

c  -1-1 --> -2
c    ( b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧  b^{1, 689}_0 ∧ -p_689) -> ( b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0)
c  in CNF:
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨  b^{1, 690}_2
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨  b^{1, 690}_1
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨  p_689 ∨ -b^{1, 690}_0
c  in DIMACS:
-3227  3228 -3229  689  3230 0
-3227  3228 -3229  689  3231 0
-3227  3228 -3229  689 -3232 0

c  -2-1 --> break 
c    ( b^{1, 689}_2 ∧  b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧ -p_689) -> break
c  in CNF:
c    -b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨  b^{1, 689}_0 ∨  p_689 ∨ break
c  in DIMACS:
-3227 -3228  3229  689 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 689}_2 ∧ -b^{1, 689}_1 ∧ -b^{1, 689}_0 ∧ true) 
c  in CNF:
c    -b^{1, 689}_2 ∨  b^{1, 689}_1 ∨  b^{1, 689}_0 ∨ false 
c  in DIMACS:
-3227  3228  3229  0

c  3 does not represent an automaton state.
c    -(-b^{1, 689}_2 ∧  b^{1, 689}_1 ∧  b^{1, 689}_0 ∧ true) 
c  in CNF:
c     b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ false 
c  in DIMACS:
 3227 -3228 -3229  0
c  -3 does not represent an automaton state.
c    -( b^{1, 689}_2 ∧  b^{1, 689}_1 ∧  b^{1, 689}_0 ∧ true) 
c  in CNF:
c    -b^{1, 689}_2 ∨ -b^{1, 689}_1 ∨ -b^{1, 689}_0 ∨ false 
c  in DIMACS:
-3227 -3228 -3229  0

c i = 690
c  -2+1 --> -1
c    ( b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧  p_690) -> ( b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0)
c  in CNF:
c    -b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨  b^{1, 691}_2
c    -b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_1
c    -b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨  b^{1, 691}_0
c  in DIMACS:
-3230 -3231  3232 -690  3233 0
-3230 -3231  3232 -690 -3234 0
-3230 -3231  3232 -690  3235 0

c  -1+1 --> 0
c    ( b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0 ∧  p_690) -> (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧ -b^{1, 691}_0)
c  in CNF:
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_2
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_1
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_0
c  in DIMACS:
-3230  3231 -3232 -690 -3233 0
-3230  3231 -3232 -690 -3234 0
-3230  3231 -3232 -690 -3235 0

c  0+1 --> 1
c    (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧  p_690) -> (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0)
c  in CNF:
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_2
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_1
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨  b^{1, 691}_0
c  in DIMACS:
 3230  3231  3232 -690 -3233 0
 3230  3231  3232 -690 -3234 0
 3230  3231  3232 -690  3235 0

c  1+1 --> 2
c    (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0 ∧  p_690) -> (-b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0)
c  in CNF:
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_2
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨  b^{1, 691}_1
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ -p_690 ∨ -b^{1, 691}_0
c  in DIMACS:
 3230  3231 -3232 -690 -3233 0
 3230  3231 -3232 -690  3234 0
 3230  3231 -3232 -690 -3235 0

c  2+1 --> break 
c    (-b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧  p_690) -> break
c  in CNF:
c     b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 3230 -3231  3232 -690 1162 0


c  2-1 --> 1
c    (-b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧ -p_690) -> (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0)
c  in CNF:
c     b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_2
c     b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_1
c     b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨  b^{1, 691}_0
c  in DIMACS:
 3230 -3231  3232  690 -3233 0
 3230 -3231  3232  690 -3234 0
 3230 -3231  3232  690  3235 0

c  1-1 --> 0
c    (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0 ∧ -p_690) -> (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧ -b^{1, 691}_0)
c  in CNF:
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_2
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_1
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_0
c  in DIMACS:
 3230  3231 -3232  690 -3233 0
 3230  3231 -3232  690 -3234 0
 3230  3231 -3232  690 -3235 0

c  0-1 --> -1
c    (-b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧ -p_690) -> ( b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0)
c  in CNF:
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨  b^{1, 691}_2
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_1
c     b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨  b^{1, 691}_0
c  in DIMACS:
 3230  3231  3232  690  3233 0
 3230  3231  3232  690 -3234 0
 3230  3231  3232  690  3235 0

c  -1-1 --> -2
c    ( b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧  b^{1, 690}_0 ∧ -p_690) -> ( b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0)
c  in CNF:
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨  b^{1, 691}_2
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨  b^{1, 691}_1
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨  p_690 ∨ -b^{1, 691}_0
c  in DIMACS:
-3230  3231 -3232  690  3233 0
-3230  3231 -3232  690  3234 0
-3230  3231 -3232  690 -3235 0

c  -2-1 --> break 
c    ( b^{1, 690}_2 ∧  b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨  b^{1, 690}_0 ∨  p_690 ∨ break
c  in DIMACS:
-3230 -3231  3232  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 690}_2 ∧ -b^{1, 690}_1 ∧ -b^{1, 690}_0 ∧ true) 
c  in CNF:
c    -b^{1, 690}_2 ∨  b^{1, 690}_1 ∨  b^{1, 690}_0 ∨ false 
c  in DIMACS:
-3230  3231  3232  0

c  3 does not represent an automaton state.
c    -(-b^{1, 690}_2 ∧  b^{1, 690}_1 ∧  b^{1, 690}_0 ∧ true) 
c  in CNF:
c     b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ false 
c  in DIMACS:
 3230 -3231 -3232  0
c  -3 does not represent an automaton state.
c    -( b^{1, 690}_2 ∧  b^{1, 690}_1 ∧  b^{1, 690}_0 ∧ true) 
c  in CNF:
c    -b^{1, 690}_2 ∨ -b^{1, 690}_1 ∨ -b^{1, 690}_0 ∨ false 
c  in DIMACS:
-3230 -3231 -3232  0

c i = 691
c  -2+1 --> -1
c    ( b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧  p_691) -> ( b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0)
c  in CNF:
c    -b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨  b^{1, 692}_2
c    -b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_1
c    -b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨  b^{1, 692}_0
c  in DIMACS:
-3233 -3234  3235 -691  3236 0
-3233 -3234  3235 -691 -3237 0
-3233 -3234  3235 -691  3238 0

c  -1+1 --> 0
c    ( b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0 ∧  p_691) -> (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧ -b^{1, 692}_0)
c  in CNF:
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_2
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_1
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_0
c  in DIMACS:
-3233  3234 -3235 -691 -3236 0
-3233  3234 -3235 -691 -3237 0
-3233  3234 -3235 -691 -3238 0

c  0+1 --> 1
c    (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧  p_691) -> (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0)
c  in CNF:
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_2
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_1
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨  b^{1, 692}_0
c  in DIMACS:
 3233  3234  3235 -691 -3236 0
 3233  3234  3235 -691 -3237 0
 3233  3234  3235 -691  3238 0

c  1+1 --> 2
c    (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0 ∧  p_691) -> (-b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0)
c  in CNF:
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_2
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨  b^{1, 692}_1
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ -p_691 ∨ -b^{1, 692}_0
c  in DIMACS:
 3233  3234 -3235 -691 -3236 0
 3233  3234 -3235 -691  3237 0
 3233  3234 -3235 -691 -3238 0

c  2+1 --> break 
c    (-b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧  p_691) -> break
c  in CNF:
c     b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ -p_691 ∨ break
c  in DIMACS:
 3233 -3234  3235 -691 1162 0


c  2-1 --> 1
c    (-b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧ -p_691) -> (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0)
c  in CNF:
c     b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_2
c     b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_1
c     b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨  b^{1, 692}_0
c  in DIMACS:
 3233 -3234  3235  691 -3236 0
 3233 -3234  3235  691 -3237 0
 3233 -3234  3235  691  3238 0

c  1-1 --> 0
c    (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0 ∧ -p_691) -> (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧ -b^{1, 692}_0)
c  in CNF:
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_2
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_1
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_0
c  in DIMACS:
 3233  3234 -3235  691 -3236 0
 3233  3234 -3235  691 -3237 0
 3233  3234 -3235  691 -3238 0

c  0-1 --> -1
c    (-b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧ -p_691) -> ( b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0)
c  in CNF:
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨  b^{1, 692}_2
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_1
c     b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨  b^{1, 692}_0
c  in DIMACS:
 3233  3234  3235  691  3236 0
 3233  3234  3235  691 -3237 0
 3233  3234  3235  691  3238 0

c  -1-1 --> -2
c    ( b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧  b^{1, 691}_0 ∧ -p_691) -> ( b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0)
c  in CNF:
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨  b^{1, 692}_2
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨  b^{1, 692}_1
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨  p_691 ∨ -b^{1, 692}_0
c  in DIMACS:
-3233  3234 -3235  691  3236 0
-3233  3234 -3235  691  3237 0
-3233  3234 -3235  691 -3238 0

c  -2-1 --> break 
c    ( b^{1, 691}_2 ∧  b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧ -p_691) -> break
c  in CNF:
c    -b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨  b^{1, 691}_0 ∨  p_691 ∨ break
c  in DIMACS:
-3233 -3234  3235  691 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 691}_2 ∧ -b^{1, 691}_1 ∧ -b^{1, 691}_0 ∧ true) 
c  in CNF:
c    -b^{1, 691}_2 ∨  b^{1, 691}_1 ∨  b^{1, 691}_0 ∨ false 
c  in DIMACS:
-3233  3234  3235  0

c  3 does not represent an automaton state.
c    -(-b^{1, 691}_2 ∧  b^{1, 691}_1 ∧  b^{1, 691}_0 ∧ true) 
c  in CNF:
c     b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ false 
c  in DIMACS:
 3233 -3234 -3235  0
c  -3 does not represent an automaton state.
c    -( b^{1, 691}_2 ∧  b^{1, 691}_1 ∧  b^{1, 691}_0 ∧ true) 
c  in CNF:
c    -b^{1, 691}_2 ∨ -b^{1, 691}_1 ∨ -b^{1, 691}_0 ∨ false 
c  in DIMACS:
-3233 -3234 -3235  0

c i = 692
c  -2+1 --> -1
c    ( b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧  p_692) -> ( b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0)
c  in CNF:
c    -b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨  b^{1, 693}_2
c    -b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_1
c    -b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨  b^{1, 693}_0
c  in DIMACS:
-3236 -3237  3238 -692  3239 0
-3236 -3237  3238 -692 -3240 0
-3236 -3237  3238 -692  3241 0

c  -1+1 --> 0
c    ( b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0 ∧  p_692) -> (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧ -b^{1, 693}_0)
c  in CNF:
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_2
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_1
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_0
c  in DIMACS:
-3236  3237 -3238 -692 -3239 0
-3236  3237 -3238 -692 -3240 0
-3236  3237 -3238 -692 -3241 0

c  0+1 --> 1
c    (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧  p_692) -> (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0)
c  in CNF:
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_2
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_1
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨  b^{1, 693}_0
c  in DIMACS:
 3236  3237  3238 -692 -3239 0
 3236  3237  3238 -692 -3240 0
 3236  3237  3238 -692  3241 0

c  1+1 --> 2
c    (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0 ∧  p_692) -> (-b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0)
c  in CNF:
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_2
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨  b^{1, 693}_1
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ -p_692 ∨ -b^{1, 693}_0
c  in DIMACS:
 3236  3237 -3238 -692 -3239 0
 3236  3237 -3238 -692  3240 0
 3236  3237 -3238 -692 -3241 0

c  2+1 --> break 
c    (-b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧  p_692) -> break
c  in CNF:
c     b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ -p_692 ∨ break
c  in DIMACS:
 3236 -3237  3238 -692 1162 0


c  2-1 --> 1
c    (-b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧ -p_692) -> (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0)
c  in CNF:
c     b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_2
c     b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_1
c     b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨  b^{1, 693}_0
c  in DIMACS:
 3236 -3237  3238  692 -3239 0
 3236 -3237  3238  692 -3240 0
 3236 -3237  3238  692  3241 0

c  1-1 --> 0
c    (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0 ∧ -p_692) -> (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧ -b^{1, 693}_0)
c  in CNF:
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_2
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_1
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_0
c  in DIMACS:
 3236  3237 -3238  692 -3239 0
 3236  3237 -3238  692 -3240 0
 3236  3237 -3238  692 -3241 0

c  0-1 --> -1
c    (-b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧ -p_692) -> ( b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0)
c  in CNF:
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨  b^{1, 693}_2
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_1
c     b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨  b^{1, 693}_0
c  in DIMACS:
 3236  3237  3238  692  3239 0
 3236  3237  3238  692 -3240 0
 3236  3237  3238  692  3241 0

c  -1-1 --> -2
c    ( b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧  b^{1, 692}_0 ∧ -p_692) -> ( b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0)
c  in CNF:
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨  b^{1, 693}_2
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨  b^{1, 693}_1
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨  p_692 ∨ -b^{1, 693}_0
c  in DIMACS:
-3236  3237 -3238  692  3239 0
-3236  3237 -3238  692  3240 0
-3236  3237 -3238  692 -3241 0

c  -2-1 --> break 
c    ( b^{1, 692}_2 ∧  b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧ -p_692) -> break
c  in CNF:
c    -b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨  b^{1, 692}_0 ∨  p_692 ∨ break
c  in DIMACS:
-3236 -3237  3238  692 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 692}_2 ∧ -b^{1, 692}_1 ∧ -b^{1, 692}_0 ∧ true) 
c  in CNF:
c    -b^{1, 692}_2 ∨  b^{1, 692}_1 ∨  b^{1, 692}_0 ∨ false 
c  in DIMACS:
-3236  3237  3238  0

c  3 does not represent an automaton state.
c    -(-b^{1, 692}_2 ∧  b^{1, 692}_1 ∧  b^{1, 692}_0 ∧ true) 
c  in CNF:
c     b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ false 
c  in DIMACS:
 3236 -3237 -3238  0
c  -3 does not represent an automaton state.
c    -( b^{1, 692}_2 ∧  b^{1, 692}_1 ∧  b^{1, 692}_0 ∧ true) 
c  in CNF:
c    -b^{1, 692}_2 ∨ -b^{1, 692}_1 ∨ -b^{1, 692}_0 ∨ false 
c  in DIMACS:
-3236 -3237 -3238  0

c i = 693
c  -2+1 --> -1
c    ( b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧  p_693) -> ( b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0)
c  in CNF:
c    -b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨  b^{1, 694}_2
c    -b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_1
c    -b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨  b^{1, 694}_0
c  in DIMACS:
-3239 -3240  3241 -693  3242 0
-3239 -3240  3241 -693 -3243 0
-3239 -3240  3241 -693  3244 0

c  -1+1 --> 0
c    ( b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0 ∧  p_693) -> (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧ -b^{1, 694}_0)
c  in CNF:
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_2
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_1
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_0
c  in DIMACS:
-3239  3240 -3241 -693 -3242 0
-3239  3240 -3241 -693 -3243 0
-3239  3240 -3241 -693 -3244 0

c  0+1 --> 1
c    (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧  p_693) -> (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0)
c  in CNF:
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_2
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_1
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨  b^{1, 694}_0
c  in DIMACS:
 3239  3240  3241 -693 -3242 0
 3239  3240  3241 -693 -3243 0
 3239  3240  3241 -693  3244 0

c  1+1 --> 2
c    (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0 ∧  p_693) -> (-b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0)
c  in CNF:
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_2
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨  b^{1, 694}_1
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ -p_693 ∨ -b^{1, 694}_0
c  in DIMACS:
 3239  3240 -3241 -693 -3242 0
 3239  3240 -3241 -693  3243 0
 3239  3240 -3241 -693 -3244 0

c  2+1 --> break 
c    (-b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧  p_693) -> break
c  in CNF:
c     b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 3239 -3240  3241 -693 1162 0


c  2-1 --> 1
c    (-b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧ -p_693) -> (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0)
c  in CNF:
c     b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_2
c     b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_1
c     b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨  b^{1, 694}_0
c  in DIMACS:
 3239 -3240  3241  693 -3242 0
 3239 -3240  3241  693 -3243 0
 3239 -3240  3241  693  3244 0

c  1-1 --> 0
c    (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0 ∧ -p_693) -> (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧ -b^{1, 694}_0)
c  in CNF:
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_2
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_1
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_0
c  in DIMACS:
 3239  3240 -3241  693 -3242 0
 3239  3240 -3241  693 -3243 0
 3239  3240 -3241  693 -3244 0

c  0-1 --> -1
c    (-b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧ -p_693) -> ( b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0)
c  in CNF:
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨  b^{1, 694}_2
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_1
c     b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨  b^{1, 694}_0
c  in DIMACS:
 3239  3240  3241  693  3242 0
 3239  3240  3241  693 -3243 0
 3239  3240  3241  693  3244 0

c  -1-1 --> -2
c    ( b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧  b^{1, 693}_0 ∧ -p_693) -> ( b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0)
c  in CNF:
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨  b^{1, 694}_2
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨  b^{1, 694}_1
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨  p_693 ∨ -b^{1, 694}_0
c  in DIMACS:
-3239  3240 -3241  693  3242 0
-3239  3240 -3241  693  3243 0
-3239  3240 -3241  693 -3244 0

c  -2-1 --> break 
c    ( b^{1, 693}_2 ∧  b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨  b^{1, 693}_0 ∨  p_693 ∨ break
c  in DIMACS:
-3239 -3240  3241  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 693}_2 ∧ -b^{1, 693}_1 ∧ -b^{1, 693}_0 ∧ true) 
c  in CNF:
c    -b^{1, 693}_2 ∨  b^{1, 693}_1 ∨  b^{1, 693}_0 ∨ false 
c  in DIMACS:
-3239  3240  3241  0

c  3 does not represent an automaton state.
c    -(-b^{1, 693}_2 ∧  b^{1, 693}_1 ∧  b^{1, 693}_0 ∧ true) 
c  in CNF:
c     b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ false 
c  in DIMACS:
 3239 -3240 -3241  0
c  -3 does not represent an automaton state.
c    -( b^{1, 693}_2 ∧  b^{1, 693}_1 ∧  b^{1, 693}_0 ∧ true) 
c  in CNF:
c    -b^{1, 693}_2 ∨ -b^{1, 693}_1 ∨ -b^{1, 693}_0 ∨ false 
c  in DIMACS:
-3239 -3240 -3241  0

c i = 694
c  -2+1 --> -1
c    ( b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧  p_694) -> ( b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0)
c  in CNF:
c    -b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨  b^{1, 695}_2
c    -b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_1
c    -b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨  b^{1, 695}_0
c  in DIMACS:
-3242 -3243  3244 -694  3245 0
-3242 -3243  3244 -694 -3246 0
-3242 -3243  3244 -694  3247 0

c  -1+1 --> 0
c    ( b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0 ∧  p_694) -> (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧ -b^{1, 695}_0)
c  in CNF:
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_2
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_1
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_0
c  in DIMACS:
-3242  3243 -3244 -694 -3245 0
-3242  3243 -3244 -694 -3246 0
-3242  3243 -3244 -694 -3247 0

c  0+1 --> 1
c    (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧  p_694) -> (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0)
c  in CNF:
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_2
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_1
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨  b^{1, 695}_0
c  in DIMACS:
 3242  3243  3244 -694 -3245 0
 3242  3243  3244 -694 -3246 0
 3242  3243  3244 -694  3247 0

c  1+1 --> 2
c    (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0 ∧  p_694) -> (-b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0)
c  in CNF:
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_2
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨  b^{1, 695}_1
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ -p_694 ∨ -b^{1, 695}_0
c  in DIMACS:
 3242  3243 -3244 -694 -3245 0
 3242  3243 -3244 -694  3246 0
 3242  3243 -3244 -694 -3247 0

c  2+1 --> break 
c    (-b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧  p_694) -> break
c  in CNF:
c     b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ -p_694 ∨ break
c  in DIMACS:
 3242 -3243  3244 -694 1162 0


c  2-1 --> 1
c    (-b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧ -p_694) -> (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0)
c  in CNF:
c     b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_2
c     b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_1
c     b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨  b^{1, 695}_0
c  in DIMACS:
 3242 -3243  3244  694 -3245 0
 3242 -3243  3244  694 -3246 0
 3242 -3243  3244  694  3247 0

c  1-1 --> 0
c    (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0 ∧ -p_694) -> (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧ -b^{1, 695}_0)
c  in CNF:
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_2
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_1
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_0
c  in DIMACS:
 3242  3243 -3244  694 -3245 0
 3242  3243 -3244  694 -3246 0
 3242  3243 -3244  694 -3247 0

c  0-1 --> -1
c    (-b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧ -p_694) -> ( b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0)
c  in CNF:
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨  b^{1, 695}_2
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_1
c     b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨  b^{1, 695}_0
c  in DIMACS:
 3242  3243  3244  694  3245 0
 3242  3243  3244  694 -3246 0
 3242  3243  3244  694  3247 0

c  -1-1 --> -2
c    ( b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧  b^{1, 694}_0 ∧ -p_694) -> ( b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0)
c  in CNF:
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨  b^{1, 695}_2
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨  b^{1, 695}_1
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨  p_694 ∨ -b^{1, 695}_0
c  in DIMACS:
-3242  3243 -3244  694  3245 0
-3242  3243 -3244  694  3246 0
-3242  3243 -3244  694 -3247 0

c  -2-1 --> break 
c    ( b^{1, 694}_2 ∧  b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧ -p_694) -> break
c  in CNF:
c    -b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨  b^{1, 694}_0 ∨  p_694 ∨ break
c  in DIMACS:
-3242 -3243  3244  694 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 694}_2 ∧ -b^{1, 694}_1 ∧ -b^{1, 694}_0 ∧ true) 
c  in CNF:
c    -b^{1, 694}_2 ∨  b^{1, 694}_1 ∨  b^{1, 694}_0 ∨ false 
c  in DIMACS:
-3242  3243  3244  0

c  3 does not represent an automaton state.
c    -(-b^{1, 694}_2 ∧  b^{1, 694}_1 ∧  b^{1, 694}_0 ∧ true) 
c  in CNF:
c     b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ false 
c  in DIMACS:
 3242 -3243 -3244  0
c  -3 does not represent an automaton state.
c    -( b^{1, 694}_2 ∧  b^{1, 694}_1 ∧  b^{1, 694}_0 ∧ true) 
c  in CNF:
c    -b^{1, 694}_2 ∨ -b^{1, 694}_1 ∨ -b^{1, 694}_0 ∨ false 
c  in DIMACS:
-3242 -3243 -3244  0

c i = 695
c  -2+1 --> -1
c    ( b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧  p_695) -> ( b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0)
c  in CNF:
c    -b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨  b^{1, 696}_2
c    -b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_1
c    -b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨  b^{1, 696}_0
c  in DIMACS:
-3245 -3246  3247 -695  3248 0
-3245 -3246  3247 -695 -3249 0
-3245 -3246  3247 -695  3250 0

c  -1+1 --> 0
c    ( b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0 ∧  p_695) -> (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧ -b^{1, 696}_0)
c  in CNF:
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_2
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_1
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_0
c  in DIMACS:
-3245  3246 -3247 -695 -3248 0
-3245  3246 -3247 -695 -3249 0
-3245  3246 -3247 -695 -3250 0

c  0+1 --> 1
c    (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧  p_695) -> (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0)
c  in CNF:
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_2
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_1
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨  b^{1, 696}_0
c  in DIMACS:
 3245  3246  3247 -695 -3248 0
 3245  3246  3247 -695 -3249 0
 3245  3246  3247 -695  3250 0

c  1+1 --> 2
c    (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0 ∧  p_695) -> (-b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0)
c  in CNF:
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_2
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨  b^{1, 696}_1
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ -p_695 ∨ -b^{1, 696}_0
c  in DIMACS:
 3245  3246 -3247 -695 -3248 0
 3245  3246 -3247 -695  3249 0
 3245  3246 -3247 -695 -3250 0

c  2+1 --> break 
c    (-b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧  p_695) -> break
c  in CNF:
c     b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ -p_695 ∨ break
c  in DIMACS:
 3245 -3246  3247 -695 1162 0


c  2-1 --> 1
c    (-b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧ -p_695) -> (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0)
c  in CNF:
c     b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_2
c     b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_1
c     b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨  b^{1, 696}_0
c  in DIMACS:
 3245 -3246  3247  695 -3248 0
 3245 -3246  3247  695 -3249 0
 3245 -3246  3247  695  3250 0

c  1-1 --> 0
c    (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0 ∧ -p_695) -> (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧ -b^{1, 696}_0)
c  in CNF:
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_2
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_1
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_0
c  in DIMACS:
 3245  3246 -3247  695 -3248 0
 3245  3246 -3247  695 -3249 0
 3245  3246 -3247  695 -3250 0

c  0-1 --> -1
c    (-b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧ -p_695) -> ( b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0)
c  in CNF:
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨  b^{1, 696}_2
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_1
c     b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨  b^{1, 696}_0
c  in DIMACS:
 3245  3246  3247  695  3248 0
 3245  3246  3247  695 -3249 0
 3245  3246  3247  695  3250 0

c  -1-1 --> -2
c    ( b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧  b^{1, 695}_0 ∧ -p_695) -> ( b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0)
c  in CNF:
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨  b^{1, 696}_2
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨  b^{1, 696}_1
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨  p_695 ∨ -b^{1, 696}_0
c  in DIMACS:
-3245  3246 -3247  695  3248 0
-3245  3246 -3247  695  3249 0
-3245  3246 -3247  695 -3250 0

c  -2-1 --> break 
c    ( b^{1, 695}_2 ∧  b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧ -p_695) -> break
c  in CNF:
c    -b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨  b^{1, 695}_0 ∨  p_695 ∨ break
c  in DIMACS:
-3245 -3246  3247  695 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 695}_2 ∧ -b^{1, 695}_1 ∧ -b^{1, 695}_0 ∧ true) 
c  in CNF:
c    -b^{1, 695}_2 ∨  b^{1, 695}_1 ∨  b^{1, 695}_0 ∨ false 
c  in DIMACS:
-3245  3246  3247  0

c  3 does not represent an automaton state.
c    -(-b^{1, 695}_2 ∧  b^{1, 695}_1 ∧  b^{1, 695}_0 ∧ true) 
c  in CNF:
c     b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ false 
c  in DIMACS:
 3245 -3246 -3247  0
c  -3 does not represent an automaton state.
c    -( b^{1, 695}_2 ∧  b^{1, 695}_1 ∧  b^{1, 695}_0 ∧ true) 
c  in CNF:
c    -b^{1, 695}_2 ∨ -b^{1, 695}_1 ∨ -b^{1, 695}_0 ∨ false 
c  in DIMACS:
-3245 -3246 -3247  0

c i = 696
c  -2+1 --> -1
c    ( b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧  p_696) -> ( b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0)
c  in CNF:
c    -b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨  b^{1, 697}_2
c    -b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_1
c    -b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨  b^{1, 697}_0
c  in DIMACS:
-3248 -3249  3250 -696  3251 0
-3248 -3249  3250 -696 -3252 0
-3248 -3249  3250 -696  3253 0

c  -1+1 --> 0
c    ( b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0 ∧  p_696) -> (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧ -b^{1, 697}_0)
c  in CNF:
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_2
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_1
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_0
c  in DIMACS:
-3248  3249 -3250 -696 -3251 0
-3248  3249 -3250 -696 -3252 0
-3248  3249 -3250 -696 -3253 0

c  0+1 --> 1
c    (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧  p_696) -> (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0)
c  in CNF:
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_2
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_1
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨  b^{1, 697}_0
c  in DIMACS:
 3248  3249  3250 -696 -3251 0
 3248  3249  3250 -696 -3252 0
 3248  3249  3250 -696  3253 0

c  1+1 --> 2
c    (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0 ∧  p_696) -> (-b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0)
c  in CNF:
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_2
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨  b^{1, 697}_1
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ -p_696 ∨ -b^{1, 697}_0
c  in DIMACS:
 3248  3249 -3250 -696 -3251 0
 3248  3249 -3250 -696  3252 0
 3248  3249 -3250 -696 -3253 0

c  2+1 --> break 
c    (-b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧  p_696) -> break
c  in CNF:
c     b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 3248 -3249  3250 -696 1162 0


c  2-1 --> 1
c    (-b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧ -p_696) -> (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0)
c  in CNF:
c     b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_2
c     b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_1
c     b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨  b^{1, 697}_0
c  in DIMACS:
 3248 -3249  3250  696 -3251 0
 3248 -3249  3250  696 -3252 0
 3248 -3249  3250  696  3253 0

c  1-1 --> 0
c    (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0 ∧ -p_696) -> (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧ -b^{1, 697}_0)
c  in CNF:
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_2
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_1
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_0
c  in DIMACS:
 3248  3249 -3250  696 -3251 0
 3248  3249 -3250  696 -3252 0
 3248  3249 -3250  696 -3253 0

c  0-1 --> -1
c    (-b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧ -p_696) -> ( b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0)
c  in CNF:
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨  b^{1, 697}_2
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_1
c     b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨  b^{1, 697}_0
c  in DIMACS:
 3248  3249  3250  696  3251 0
 3248  3249  3250  696 -3252 0
 3248  3249  3250  696  3253 0

c  -1-1 --> -2
c    ( b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧  b^{1, 696}_0 ∧ -p_696) -> ( b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0)
c  in CNF:
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨  b^{1, 697}_2
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨  b^{1, 697}_1
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨  p_696 ∨ -b^{1, 697}_0
c  in DIMACS:
-3248  3249 -3250  696  3251 0
-3248  3249 -3250  696  3252 0
-3248  3249 -3250  696 -3253 0

c  -2-1 --> break 
c    ( b^{1, 696}_2 ∧  b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨  b^{1, 696}_0 ∨  p_696 ∨ break
c  in DIMACS:
-3248 -3249  3250  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 696}_2 ∧ -b^{1, 696}_1 ∧ -b^{1, 696}_0 ∧ true) 
c  in CNF:
c    -b^{1, 696}_2 ∨  b^{1, 696}_1 ∨  b^{1, 696}_0 ∨ false 
c  in DIMACS:
-3248  3249  3250  0

c  3 does not represent an automaton state.
c    -(-b^{1, 696}_2 ∧  b^{1, 696}_1 ∧  b^{1, 696}_0 ∧ true) 
c  in CNF:
c     b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ false 
c  in DIMACS:
 3248 -3249 -3250  0
c  -3 does not represent an automaton state.
c    -( b^{1, 696}_2 ∧  b^{1, 696}_1 ∧  b^{1, 696}_0 ∧ true) 
c  in CNF:
c    -b^{1, 696}_2 ∨ -b^{1, 696}_1 ∨ -b^{1, 696}_0 ∨ false 
c  in DIMACS:
-3248 -3249 -3250  0

c i = 697
c  -2+1 --> -1
c    ( b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧  p_697) -> ( b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0)
c  in CNF:
c    -b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨  b^{1, 698}_2
c    -b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_1
c    -b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨  b^{1, 698}_0
c  in DIMACS:
-3251 -3252  3253 -697  3254 0
-3251 -3252  3253 -697 -3255 0
-3251 -3252  3253 -697  3256 0

c  -1+1 --> 0
c    ( b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0 ∧  p_697) -> (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧ -b^{1, 698}_0)
c  in CNF:
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_2
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_1
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_0
c  in DIMACS:
-3251  3252 -3253 -697 -3254 0
-3251  3252 -3253 -697 -3255 0
-3251  3252 -3253 -697 -3256 0

c  0+1 --> 1
c    (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧  p_697) -> (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0)
c  in CNF:
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_2
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_1
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨  b^{1, 698}_0
c  in DIMACS:
 3251  3252  3253 -697 -3254 0
 3251  3252  3253 -697 -3255 0
 3251  3252  3253 -697  3256 0

c  1+1 --> 2
c    (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0 ∧  p_697) -> (-b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0)
c  in CNF:
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_2
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨  b^{1, 698}_1
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ -p_697 ∨ -b^{1, 698}_0
c  in DIMACS:
 3251  3252 -3253 -697 -3254 0
 3251  3252 -3253 -697  3255 0
 3251  3252 -3253 -697 -3256 0

c  2+1 --> break 
c    (-b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧  p_697) -> break
c  in CNF:
c     b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ -p_697 ∨ break
c  in DIMACS:
 3251 -3252  3253 -697 1162 0


c  2-1 --> 1
c    (-b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧ -p_697) -> (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0)
c  in CNF:
c     b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_2
c     b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_1
c     b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨  b^{1, 698}_0
c  in DIMACS:
 3251 -3252  3253  697 -3254 0
 3251 -3252  3253  697 -3255 0
 3251 -3252  3253  697  3256 0

c  1-1 --> 0
c    (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0 ∧ -p_697) -> (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧ -b^{1, 698}_0)
c  in CNF:
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_2
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_1
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_0
c  in DIMACS:
 3251  3252 -3253  697 -3254 0
 3251  3252 -3253  697 -3255 0
 3251  3252 -3253  697 -3256 0

c  0-1 --> -1
c    (-b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧ -p_697) -> ( b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0)
c  in CNF:
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨  b^{1, 698}_2
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_1
c     b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨  b^{1, 698}_0
c  in DIMACS:
 3251  3252  3253  697  3254 0
 3251  3252  3253  697 -3255 0
 3251  3252  3253  697  3256 0

c  -1-1 --> -2
c    ( b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧  b^{1, 697}_0 ∧ -p_697) -> ( b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0)
c  in CNF:
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨  b^{1, 698}_2
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨  b^{1, 698}_1
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨  p_697 ∨ -b^{1, 698}_0
c  in DIMACS:
-3251  3252 -3253  697  3254 0
-3251  3252 -3253  697  3255 0
-3251  3252 -3253  697 -3256 0

c  -2-1 --> break 
c    ( b^{1, 697}_2 ∧  b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧ -p_697) -> break
c  in CNF:
c    -b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨  b^{1, 697}_0 ∨  p_697 ∨ break
c  in DIMACS:
-3251 -3252  3253  697 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 697}_2 ∧ -b^{1, 697}_1 ∧ -b^{1, 697}_0 ∧ true) 
c  in CNF:
c    -b^{1, 697}_2 ∨  b^{1, 697}_1 ∨  b^{1, 697}_0 ∨ false 
c  in DIMACS:
-3251  3252  3253  0

c  3 does not represent an automaton state.
c    -(-b^{1, 697}_2 ∧  b^{1, 697}_1 ∧  b^{1, 697}_0 ∧ true) 
c  in CNF:
c     b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ false 
c  in DIMACS:
 3251 -3252 -3253  0
c  -3 does not represent an automaton state.
c    -( b^{1, 697}_2 ∧  b^{1, 697}_1 ∧  b^{1, 697}_0 ∧ true) 
c  in CNF:
c    -b^{1, 697}_2 ∨ -b^{1, 697}_1 ∨ -b^{1, 697}_0 ∨ false 
c  in DIMACS:
-3251 -3252 -3253  0

c i = 698
c  -2+1 --> -1
c    ( b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧  p_698) -> ( b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0)
c  in CNF:
c    -b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨  b^{1, 699}_2
c    -b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_1
c    -b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨  b^{1, 699}_0
c  in DIMACS:
-3254 -3255  3256 -698  3257 0
-3254 -3255  3256 -698 -3258 0
-3254 -3255  3256 -698  3259 0

c  -1+1 --> 0
c    ( b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0 ∧  p_698) -> (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧ -b^{1, 699}_0)
c  in CNF:
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_2
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_1
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_0
c  in DIMACS:
-3254  3255 -3256 -698 -3257 0
-3254  3255 -3256 -698 -3258 0
-3254  3255 -3256 -698 -3259 0

c  0+1 --> 1
c    (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧  p_698) -> (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0)
c  in CNF:
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_2
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_1
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨  b^{1, 699}_0
c  in DIMACS:
 3254  3255  3256 -698 -3257 0
 3254  3255  3256 -698 -3258 0
 3254  3255  3256 -698  3259 0

c  1+1 --> 2
c    (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0 ∧  p_698) -> (-b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0)
c  in CNF:
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_2
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨  b^{1, 699}_1
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ -p_698 ∨ -b^{1, 699}_0
c  in DIMACS:
 3254  3255 -3256 -698 -3257 0
 3254  3255 -3256 -698  3258 0
 3254  3255 -3256 -698 -3259 0

c  2+1 --> break 
c    (-b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧  p_698) -> break
c  in CNF:
c     b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ -p_698 ∨ break
c  in DIMACS:
 3254 -3255  3256 -698 1162 0


c  2-1 --> 1
c    (-b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧ -p_698) -> (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0)
c  in CNF:
c     b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_2
c     b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_1
c     b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨  b^{1, 699}_0
c  in DIMACS:
 3254 -3255  3256  698 -3257 0
 3254 -3255  3256  698 -3258 0
 3254 -3255  3256  698  3259 0

c  1-1 --> 0
c    (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0 ∧ -p_698) -> (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧ -b^{1, 699}_0)
c  in CNF:
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_2
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_1
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_0
c  in DIMACS:
 3254  3255 -3256  698 -3257 0
 3254  3255 -3256  698 -3258 0
 3254  3255 -3256  698 -3259 0

c  0-1 --> -1
c    (-b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧ -p_698) -> ( b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0)
c  in CNF:
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨  b^{1, 699}_2
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_1
c     b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨  b^{1, 699}_0
c  in DIMACS:
 3254  3255  3256  698  3257 0
 3254  3255  3256  698 -3258 0
 3254  3255  3256  698  3259 0

c  -1-1 --> -2
c    ( b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧  b^{1, 698}_0 ∧ -p_698) -> ( b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0)
c  in CNF:
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨  b^{1, 699}_2
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨  b^{1, 699}_1
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨  p_698 ∨ -b^{1, 699}_0
c  in DIMACS:
-3254  3255 -3256  698  3257 0
-3254  3255 -3256  698  3258 0
-3254  3255 -3256  698 -3259 0

c  -2-1 --> break 
c    ( b^{1, 698}_2 ∧  b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧ -p_698) -> break
c  in CNF:
c    -b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨  b^{1, 698}_0 ∨  p_698 ∨ break
c  in DIMACS:
-3254 -3255  3256  698 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 698}_2 ∧ -b^{1, 698}_1 ∧ -b^{1, 698}_0 ∧ true) 
c  in CNF:
c    -b^{1, 698}_2 ∨  b^{1, 698}_1 ∨  b^{1, 698}_0 ∨ false 
c  in DIMACS:
-3254  3255  3256  0

c  3 does not represent an automaton state.
c    -(-b^{1, 698}_2 ∧  b^{1, 698}_1 ∧  b^{1, 698}_0 ∧ true) 
c  in CNF:
c     b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ false 
c  in DIMACS:
 3254 -3255 -3256  0
c  -3 does not represent an automaton state.
c    -( b^{1, 698}_2 ∧  b^{1, 698}_1 ∧  b^{1, 698}_0 ∧ true) 
c  in CNF:
c    -b^{1, 698}_2 ∨ -b^{1, 698}_1 ∨ -b^{1, 698}_0 ∨ false 
c  in DIMACS:
-3254 -3255 -3256  0

c i = 699
c  -2+1 --> -1
c    ( b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧  p_699) -> ( b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0)
c  in CNF:
c    -b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨  b^{1, 700}_2
c    -b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_1
c    -b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨  b^{1, 700}_0
c  in DIMACS:
-3257 -3258  3259 -699  3260 0
-3257 -3258  3259 -699 -3261 0
-3257 -3258  3259 -699  3262 0

c  -1+1 --> 0
c    ( b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0 ∧  p_699) -> (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧ -b^{1, 700}_0)
c  in CNF:
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_2
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_1
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_0
c  in DIMACS:
-3257  3258 -3259 -699 -3260 0
-3257  3258 -3259 -699 -3261 0
-3257  3258 -3259 -699 -3262 0

c  0+1 --> 1
c    (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧  p_699) -> (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0)
c  in CNF:
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_2
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_1
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨  b^{1, 700}_0
c  in DIMACS:
 3257  3258  3259 -699 -3260 0
 3257  3258  3259 -699 -3261 0
 3257  3258  3259 -699  3262 0

c  1+1 --> 2
c    (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0 ∧  p_699) -> (-b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0)
c  in CNF:
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_2
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨  b^{1, 700}_1
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ -p_699 ∨ -b^{1, 700}_0
c  in DIMACS:
 3257  3258 -3259 -699 -3260 0
 3257  3258 -3259 -699  3261 0
 3257  3258 -3259 -699 -3262 0

c  2+1 --> break 
c    (-b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧  p_699) -> break
c  in CNF:
c     b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ -p_699 ∨ break
c  in DIMACS:
 3257 -3258  3259 -699 1162 0


c  2-1 --> 1
c    (-b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧ -p_699) -> (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0)
c  in CNF:
c     b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_2
c     b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_1
c     b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨  b^{1, 700}_0
c  in DIMACS:
 3257 -3258  3259  699 -3260 0
 3257 -3258  3259  699 -3261 0
 3257 -3258  3259  699  3262 0

c  1-1 --> 0
c    (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0 ∧ -p_699) -> (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧ -b^{1, 700}_0)
c  in CNF:
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_2
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_1
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_0
c  in DIMACS:
 3257  3258 -3259  699 -3260 0
 3257  3258 -3259  699 -3261 0
 3257  3258 -3259  699 -3262 0

c  0-1 --> -1
c    (-b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧ -p_699) -> ( b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0)
c  in CNF:
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨  b^{1, 700}_2
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_1
c     b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨  b^{1, 700}_0
c  in DIMACS:
 3257  3258  3259  699  3260 0
 3257  3258  3259  699 -3261 0
 3257  3258  3259  699  3262 0

c  -1-1 --> -2
c    ( b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧  b^{1, 699}_0 ∧ -p_699) -> ( b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0)
c  in CNF:
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨  b^{1, 700}_2
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨  b^{1, 700}_1
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨  p_699 ∨ -b^{1, 700}_0
c  in DIMACS:
-3257  3258 -3259  699  3260 0
-3257  3258 -3259  699  3261 0
-3257  3258 -3259  699 -3262 0

c  -2-1 --> break 
c    ( b^{1, 699}_2 ∧  b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧ -p_699) -> break
c  in CNF:
c    -b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨  b^{1, 699}_0 ∨  p_699 ∨ break
c  in DIMACS:
-3257 -3258  3259  699 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 699}_2 ∧ -b^{1, 699}_1 ∧ -b^{1, 699}_0 ∧ true) 
c  in CNF:
c    -b^{1, 699}_2 ∨  b^{1, 699}_1 ∨  b^{1, 699}_0 ∨ false 
c  in DIMACS:
-3257  3258  3259  0

c  3 does not represent an automaton state.
c    -(-b^{1, 699}_2 ∧  b^{1, 699}_1 ∧  b^{1, 699}_0 ∧ true) 
c  in CNF:
c     b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ false 
c  in DIMACS:
 3257 -3258 -3259  0
c  -3 does not represent an automaton state.
c    -( b^{1, 699}_2 ∧  b^{1, 699}_1 ∧  b^{1, 699}_0 ∧ true) 
c  in CNF:
c    -b^{1, 699}_2 ∨ -b^{1, 699}_1 ∨ -b^{1, 699}_0 ∨ false 
c  in DIMACS:
-3257 -3258 -3259  0

c i = 700
c  -2+1 --> -1
c    ( b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧  p_700) -> ( b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0)
c  in CNF:
c    -b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨  b^{1, 701}_2
c    -b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_1
c    -b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨  b^{1, 701}_0
c  in DIMACS:
-3260 -3261  3262 -700  3263 0
-3260 -3261  3262 -700 -3264 0
-3260 -3261  3262 -700  3265 0

c  -1+1 --> 0
c    ( b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0 ∧  p_700) -> (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧ -b^{1, 701}_0)
c  in CNF:
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_2
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_1
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_0
c  in DIMACS:
-3260  3261 -3262 -700 -3263 0
-3260  3261 -3262 -700 -3264 0
-3260  3261 -3262 -700 -3265 0

c  0+1 --> 1
c    (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧  p_700) -> (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0)
c  in CNF:
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_2
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_1
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨  b^{1, 701}_0
c  in DIMACS:
 3260  3261  3262 -700 -3263 0
 3260  3261  3262 -700 -3264 0
 3260  3261  3262 -700  3265 0

c  1+1 --> 2
c    (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0 ∧  p_700) -> (-b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0)
c  in CNF:
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_2
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨  b^{1, 701}_1
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ -p_700 ∨ -b^{1, 701}_0
c  in DIMACS:
 3260  3261 -3262 -700 -3263 0
 3260  3261 -3262 -700  3264 0
 3260  3261 -3262 -700 -3265 0

c  2+1 --> break 
c    (-b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧  p_700) -> break
c  in CNF:
c     b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 3260 -3261  3262 -700 1162 0


c  2-1 --> 1
c    (-b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧ -p_700) -> (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0)
c  in CNF:
c     b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_2
c     b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_1
c     b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨  b^{1, 701}_0
c  in DIMACS:
 3260 -3261  3262  700 -3263 0
 3260 -3261  3262  700 -3264 0
 3260 -3261  3262  700  3265 0

c  1-1 --> 0
c    (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0 ∧ -p_700) -> (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧ -b^{1, 701}_0)
c  in CNF:
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_2
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_1
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_0
c  in DIMACS:
 3260  3261 -3262  700 -3263 0
 3260  3261 -3262  700 -3264 0
 3260  3261 -3262  700 -3265 0

c  0-1 --> -1
c    (-b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧ -p_700) -> ( b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0)
c  in CNF:
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨  b^{1, 701}_2
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_1
c     b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨  b^{1, 701}_0
c  in DIMACS:
 3260  3261  3262  700  3263 0
 3260  3261  3262  700 -3264 0
 3260  3261  3262  700  3265 0

c  -1-1 --> -2
c    ( b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧  b^{1, 700}_0 ∧ -p_700) -> ( b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0)
c  in CNF:
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨  b^{1, 701}_2
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨  b^{1, 701}_1
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨  p_700 ∨ -b^{1, 701}_0
c  in DIMACS:
-3260  3261 -3262  700  3263 0
-3260  3261 -3262  700  3264 0
-3260  3261 -3262  700 -3265 0

c  -2-1 --> break 
c    ( b^{1, 700}_2 ∧  b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨  b^{1, 700}_0 ∨  p_700 ∨ break
c  in DIMACS:
-3260 -3261  3262  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 700}_2 ∧ -b^{1, 700}_1 ∧ -b^{1, 700}_0 ∧ true) 
c  in CNF:
c    -b^{1, 700}_2 ∨  b^{1, 700}_1 ∨  b^{1, 700}_0 ∨ false 
c  in DIMACS:
-3260  3261  3262  0

c  3 does not represent an automaton state.
c    -(-b^{1, 700}_2 ∧  b^{1, 700}_1 ∧  b^{1, 700}_0 ∧ true) 
c  in CNF:
c     b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ false 
c  in DIMACS:
 3260 -3261 -3262  0
c  -3 does not represent an automaton state.
c    -( b^{1, 700}_2 ∧  b^{1, 700}_1 ∧  b^{1, 700}_0 ∧ true) 
c  in CNF:
c    -b^{1, 700}_2 ∨ -b^{1, 700}_1 ∨ -b^{1, 700}_0 ∨ false 
c  in DIMACS:
-3260 -3261 -3262  0

c i = 701
c  -2+1 --> -1
c    ( b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧  p_701) -> ( b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0)
c  in CNF:
c    -b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨  b^{1, 702}_2
c    -b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_1
c    -b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨  b^{1, 702}_0
c  in DIMACS:
-3263 -3264  3265 -701  3266 0
-3263 -3264  3265 -701 -3267 0
-3263 -3264  3265 -701  3268 0

c  -1+1 --> 0
c    ( b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0 ∧  p_701) -> (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧ -b^{1, 702}_0)
c  in CNF:
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_2
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_1
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_0
c  in DIMACS:
-3263  3264 -3265 -701 -3266 0
-3263  3264 -3265 -701 -3267 0
-3263  3264 -3265 -701 -3268 0

c  0+1 --> 1
c    (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧  p_701) -> (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0)
c  in CNF:
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_2
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_1
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨  b^{1, 702}_0
c  in DIMACS:
 3263  3264  3265 -701 -3266 0
 3263  3264  3265 -701 -3267 0
 3263  3264  3265 -701  3268 0

c  1+1 --> 2
c    (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0 ∧  p_701) -> (-b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0)
c  in CNF:
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_2
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨  b^{1, 702}_1
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ -p_701 ∨ -b^{1, 702}_0
c  in DIMACS:
 3263  3264 -3265 -701 -3266 0
 3263  3264 -3265 -701  3267 0
 3263  3264 -3265 -701 -3268 0

c  2+1 --> break 
c    (-b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧  p_701) -> break
c  in CNF:
c     b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ -p_701 ∨ break
c  in DIMACS:
 3263 -3264  3265 -701 1162 0


c  2-1 --> 1
c    (-b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧ -p_701) -> (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0)
c  in CNF:
c     b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_2
c     b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_1
c     b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨  b^{1, 702}_0
c  in DIMACS:
 3263 -3264  3265  701 -3266 0
 3263 -3264  3265  701 -3267 0
 3263 -3264  3265  701  3268 0

c  1-1 --> 0
c    (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0 ∧ -p_701) -> (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧ -b^{1, 702}_0)
c  in CNF:
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_2
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_1
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_0
c  in DIMACS:
 3263  3264 -3265  701 -3266 0
 3263  3264 -3265  701 -3267 0
 3263  3264 -3265  701 -3268 0

c  0-1 --> -1
c    (-b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧ -p_701) -> ( b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0)
c  in CNF:
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨  b^{1, 702}_2
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_1
c     b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨  b^{1, 702}_0
c  in DIMACS:
 3263  3264  3265  701  3266 0
 3263  3264  3265  701 -3267 0
 3263  3264  3265  701  3268 0

c  -1-1 --> -2
c    ( b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧  b^{1, 701}_0 ∧ -p_701) -> ( b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0)
c  in CNF:
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨  b^{1, 702}_2
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨  b^{1, 702}_1
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨  p_701 ∨ -b^{1, 702}_0
c  in DIMACS:
-3263  3264 -3265  701  3266 0
-3263  3264 -3265  701  3267 0
-3263  3264 -3265  701 -3268 0

c  -2-1 --> break 
c    ( b^{1, 701}_2 ∧  b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧ -p_701) -> break
c  in CNF:
c    -b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨  b^{1, 701}_0 ∨  p_701 ∨ break
c  in DIMACS:
-3263 -3264  3265  701 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 701}_2 ∧ -b^{1, 701}_1 ∧ -b^{1, 701}_0 ∧ true) 
c  in CNF:
c    -b^{1, 701}_2 ∨  b^{1, 701}_1 ∨  b^{1, 701}_0 ∨ false 
c  in DIMACS:
-3263  3264  3265  0

c  3 does not represent an automaton state.
c    -(-b^{1, 701}_2 ∧  b^{1, 701}_1 ∧  b^{1, 701}_0 ∧ true) 
c  in CNF:
c     b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ false 
c  in DIMACS:
 3263 -3264 -3265  0
c  -3 does not represent an automaton state.
c    -( b^{1, 701}_2 ∧  b^{1, 701}_1 ∧  b^{1, 701}_0 ∧ true) 
c  in CNF:
c    -b^{1, 701}_2 ∨ -b^{1, 701}_1 ∨ -b^{1, 701}_0 ∨ false 
c  in DIMACS:
-3263 -3264 -3265  0

c i = 702
c  -2+1 --> -1
c    ( b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧  p_702) -> ( b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0)
c  in CNF:
c    -b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨  b^{1, 703}_2
c    -b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_1
c    -b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨  b^{1, 703}_0
c  in DIMACS:
-3266 -3267  3268 -702  3269 0
-3266 -3267  3268 -702 -3270 0
-3266 -3267  3268 -702  3271 0

c  -1+1 --> 0
c    ( b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0 ∧  p_702) -> (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧ -b^{1, 703}_0)
c  in CNF:
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_2
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_1
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_0
c  in DIMACS:
-3266  3267 -3268 -702 -3269 0
-3266  3267 -3268 -702 -3270 0
-3266  3267 -3268 -702 -3271 0

c  0+1 --> 1
c    (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧  p_702) -> (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0)
c  in CNF:
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_2
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_1
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨  b^{1, 703}_0
c  in DIMACS:
 3266  3267  3268 -702 -3269 0
 3266  3267  3268 -702 -3270 0
 3266  3267  3268 -702  3271 0

c  1+1 --> 2
c    (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0 ∧  p_702) -> (-b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0)
c  in CNF:
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_2
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨  b^{1, 703}_1
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ -p_702 ∨ -b^{1, 703}_0
c  in DIMACS:
 3266  3267 -3268 -702 -3269 0
 3266  3267 -3268 -702  3270 0
 3266  3267 -3268 -702 -3271 0

c  2+1 --> break 
c    (-b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧  p_702) -> break
c  in CNF:
c     b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 3266 -3267  3268 -702 1162 0


c  2-1 --> 1
c    (-b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧ -p_702) -> (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0)
c  in CNF:
c     b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_2
c     b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_1
c     b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨  b^{1, 703}_0
c  in DIMACS:
 3266 -3267  3268  702 -3269 0
 3266 -3267  3268  702 -3270 0
 3266 -3267  3268  702  3271 0

c  1-1 --> 0
c    (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0 ∧ -p_702) -> (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧ -b^{1, 703}_0)
c  in CNF:
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_2
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_1
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_0
c  in DIMACS:
 3266  3267 -3268  702 -3269 0
 3266  3267 -3268  702 -3270 0
 3266  3267 -3268  702 -3271 0

c  0-1 --> -1
c    (-b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧ -p_702) -> ( b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0)
c  in CNF:
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨  b^{1, 703}_2
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_1
c     b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨  b^{1, 703}_0
c  in DIMACS:
 3266  3267  3268  702  3269 0
 3266  3267  3268  702 -3270 0
 3266  3267  3268  702  3271 0

c  -1-1 --> -2
c    ( b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧  b^{1, 702}_0 ∧ -p_702) -> ( b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0)
c  in CNF:
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨  b^{1, 703}_2
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨  b^{1, 703}_1
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨  p_702 ∨ -b^{1, 703}_0
c  in DIMACS:
-3266  3267 -3268  702  3269 0
-3266  3267 -3268  702  3270 0
-3266  3267 -3268  702 -3271 0

c  -2-1 --> break 
c    ( b^{1, 702}_2 ∧  b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨  b^{1, 702}_0 ∨  p_702 ∨ break
c  in DIMACS:
-3266 -3267  3268  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 702}_2 ∧ -b^{1, 702}_1 ∧ -b^{1, 702}_0 ∧ true) 
c  in CNF:
c    -b^{1, 702}_2 ∨  b^{1, 702}_1 ∨  b^{1, 702}_0 ∨ false 
c  in DIMACS:
-3266  3267  3268  0

c  3 does not represent an automaton state.
c    -(-b^{1, 702}_2 ∧  b^{1, 702}_1 ∧  b^{1, 702}_0 ∧ true) 
c  in CNF:
c     b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ false 
c  in DIMACS:
 3266 -3267 -3268  0
c  -3 does not represent an automaton state.
c    -( b^{1, 702}_2 ∧  b^{1, 702}_1 ∧  b^{1, 702}_0 ∧ true) 
c  in CNF:
c    -b^{1, 702}_2 ∨ -b^{1, 702}_1 ∨ -b^{1, 702}_0 ∨ false 
c  in DIMACS:
-3266 -3267 -3268  0

c i = 703
c  -2+1 --> -1
c    ( b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧  p_703) -> ( b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0)
c  in CNF:
c    -b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨  b^{1, 704}_2
c    -b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_1
c    -b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨  b^{1, 704}_0
c  in DIMACS:
-3269 -3270  3271 -703  3272 0
-3269 -3270  3271 -703 -3273 0
-3269 -3270  3271 -703  3274 0

c  -1+1 --> 0
c    ( b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0 ∧  p_703) -> (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧ -b^{1, 704}_0)
c  in CNF:
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_2
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_1
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_0
c  in DIMACS:
-3269  3270 -3271 -703 -3272 0
-3269  3270 -3271 -703 -3273 0
-3269  3270 -3271 -703 -3274 0

c  0+1 --> 1
c    (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧  p_703) -> (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0)
c  in CNF:
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_2
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_1
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨  b^{1, 704}_0
c  in DIMACS:
 3269  3270  3271 -703 -3272 0
 3269  3270  3271 -703 -3273 0
 3269  3270  3271 -703  3274 0

c  1+1 --> 2
c    (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0 ∧  p_703) -> (-b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0)
c  in CNF:
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_2
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨  b^{1, 704}_1
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ -p_703 ∨ -b^{1, 704}_0
c  in DIMACS:
 3269  3270 -3271 -703 -3272 0
 3269  3270 -3271 -703  3273 0
 3269  3270 -3271 -703 -3274 0

c  2+1 --> break 
c    (-b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧  p_703) -> break
c  in CNF:
c     b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ -p_703 ∨ break
c  in DIMACS:
 3269 -3270  3271 -703 1162 0


c  2-1 --> 1
c    (-b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧ -p_703) -> (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0)
c  in CNF:
c     b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_2
c     b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_1
c     b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨  b^{1, 704}_0
c  in DIMACS:
 3269 -3270  3271  703 -3272 0
 3269 -3270  3271  703 -3273 0
 3269 -3270  3271  703  3274 0

c  1-1 --> 0
c    (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0 ∧ -p_703) -> (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧ -b^{1, 704}_0)
c  in CNF:
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_2
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_1
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_0
c  in DIMACS:
 3269  3270 -3271  703 -3272 0
 3269  3270 -3271  703 -3273 0
 3269  3270 -3271  703 -3274 0

c  0-1 --> -1
c    (-b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧ -p_703) -> ( b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0)
c  in CNF:
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨  b^{1, 704}_2
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_1
c     b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨  b^{1, 704}_0
c  in DIMACS:
 3269  3270  3271  703  3272 0
 3269  3270  3271  703 -3273 0
 3269  3270  3271  703  3274 0

c  -1-1 --> -2
c    ( b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧  b^{1, 703}_0 ∧ -p_703) -> ( b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0)
c  in CNF:
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨  b^{1, 704}_2
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨  b^{1, 704}_1
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨  p_703 ∨ -b^{1, 704}_0
c  in DIMACS:
-3269  3270 -3271  703  3272 0
-3269  3270 -3271  703  3273 0
-3269  3270 -3271  703 -3274 0

c  -2-1 --> break 
c    ( b^{1, 703}_2 ∧  b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧ -p_703) -> break
c  in CNF:
c    -b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨  b^{1, 703}_0 ∨  p_703 ∨ break
c  in DIMACS:
-3269 -3270  3271  703 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 703}_2 ∧ -b^{1, 703}_1 ∧ -b^{1, 703}_0 ∧ true) 
c  in CNF:
c    -b^{1, 703}_2 ∨  b^{1, 703}_1 ∨  b^{1, 703}_0 ∨ false 
c  in DIMACS:
-3269  3270  3271  0

c  3 does not represent an automaton state.
c    -(-b^{1, 703}_2 ∧  b^{1, 703}_1 ∧  b^{1, 703}_0 ∧ true) 
c  in CNF:
c     b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ false 
c  in DIMACS:
 3269 -3270 -3271  0
c  -3 does not represent an automaton state.
c    -( b^{1, 703}_2 ∧  b^{1, 703}_1 ∧  b^{1, 703}_0 ∧ true) 
c  in CNF:
c    -b^{1, 703}_2 ∨ -b^{1, 703}_1 ∨ -b^{1, 703}_0 ∨ false 
c  in DIMACS:
-3269 -3270 -3271  0

c i = 704
c  -2+1 --> -1
c    ( b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧  p_704) -> ( b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0)
c  in CNF:
c    -b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨  b^{1, 705}_2
c    -b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_1
c    -b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨  b^{1, 705}_0
c  in DIMACS:
-3272 -3273  3274 -704  3275 0
-3272 -3273  3274 -704 -3276 0
-3272 -3273  3274 -704  3277 0

c  -1+1 --> 0
c    ( b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0 ∧  p_704) -> (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧ -b^{1, 705}_0)
c  in CNF:
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_2
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_1
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_0
c  in DIMACS:
-3272  3273 -3274 -704 -3275 0
-3272  3273 -3274 -704 -3276 0
-3272  3273 -3274 -704 -3277 0

c  0+1 --> 1
c    (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧  p_704) -> (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0)
c  in CNF:
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_2
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_1
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨  b^{1, 705}_0
c  in DIMACS:
 3272  3273  3274 -704 -3275 0
 3272  3273  3274 -704 -3276 0
 3272  3273  3274 -704  3277 0

c  1+1 --> 2
c    (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0 ∧  p_704) -> (-b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0)
c  in CNF:
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_2
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨  b^{1, 705}_1
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ -p_704 ∨ -b^{1, 705}_0
c  in DIMACS:
 3272  3273 -3274 -704 -3275 0
 3272  3273 -3274 -704  3276 0
 3272  3273 -3274 -704 -3277 0

c  2+1 --> break 
c    (-b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧  p_704) -> break
c  in CNF:
c     b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 3272 -3273  3274 -704 1162 0


c  2-1 --> 1
c    (-b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧ -p_704) -> (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0)
c  in CNF:
c     b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_2
c     b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_1
c     b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨  b^{1, 705}_0
c  in DIMACS:
 3272 -3273  3274  704 -3275 0
 3272 -3273  3274  704 -3276 0
 3272 -3273  3274  704  3277 0

c  1-1 --> 0
c    (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0 ∧ -p_704) -> (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧ -b^{1, 705}_0)
c  in CNF:
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_2
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_1
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_0
c  in DIMACS:
 3272  3273 -3274  704 -3275 0
 3272  3273 -3274  704 -3276 0
 3272  3273 -3274  704 -3277 0

c  0-1 --> -1
c    (-b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧ -p_704) -> ( b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0)
c  in CNF:
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨  b^{1, 705}_2
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_1
c     b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨  b^{1, 705}_0
c  in DIMACS:
 3272  3273  3274  704  3275 0
 3272  3273  3274  704 -3276 0
 3272  3273  3274  704  3277 0

c  -1-1 --> -2
c    ( b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧  b^{1, 704}_0 ∧ -p_704) -> ( b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0)
c  in CNF:
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨  b^{1, 705}_2
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨  b^{1, 705}_1
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨  p_704 ∨ -b^{1, 705}_0
c  in DIMACS:
-3272  3273 -3274  704  3275 0
-3272  3273 -3274  704  3276 0
-3272  3273 -3274  704 -3277 0

c  -2-1 --> break 
c    ( b^{1, 704}_2 ∧  b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨  b^{1, 704}_0 ∨  p_704 ∨ break
c  in DIMACS:
-3272 -3273  3274  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 704}_2 ∧ -b^{1, 704}_1 ∧ -b^{1, 704}_0 ∧ true) 
c  in CNF:
c    -b^{1, 704}_2 ∨  b^{1, 704}_1 ∨  b^{1, 704}_0 ∨ false 
c  in DIMACS:
-3272  3273  3274  0

c  3 does not represent an automaton state.
c    -(-b^{1, 704}_2 ∧  b^{1, 704}_1 ∧  b^{1, 704}_0 ∧ true) 
c  in CNF:
c     b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ false 
c  in DIMACS:
 3272 -3273 -3274  0
c  -3 does not represent an automaton state.
c    -( b^{1, 704}_2 ∧  b^{1, 704}_1 ∧  b^{1, 704}_0 ∧ true) 
c  in CNF:
c    -b^{1, 704}_2 ∨ -b^{1, 704}_1 ∨ -b^{1, 704}_0 ∨ false 
c  in DIMACS:
-3272 -3273 -3274  0

c i = 705
c  -2+1 --> -1
c    ( b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧  p_705) -> ( b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0)
c  in CNF:
c    -b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨  b^{1, 706}_2
c    -b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_1
c    -b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨  b^{1, 706}_0
c  in DIMACS:
-3275 -3276  3277 -705  3278 0
-3275 -3276  3277 -705 -3279 0
-3275 -3276  3277 -705  3280 0

c  -1+1 --> 0
c    ( b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0 ∧  p_705) -> (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧ -b^{1, 706}_0)
c  in CNF:
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_2
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_1
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_0
c  in DIMACS:
-3275  3276 -3277 -705 -3278 0
-3275  3276 -3277 -705 -3279 0
-3275  3276 -3277 -705 -3280 0

c  0+1 --> 1
c    (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧  p_705) -> (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0)
c  in CNF:
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_2
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_1
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨  b^{1, 706}_0
c  in DIMACS:
 3275  3276  3277 -705 -3278 0
 3275  3276  3277 -705 -3279 0
 3275  3276  3277 -705  3280 0

c  1+1 --> 2
c    (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0 ∧  p_705) -> (-b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0)
c  in CNF:
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_2
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨  b^{1, 706}_1
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ -p_705 ∨ -b^{1, 706}_0
c  in DIMACS:
 3275  3276 -3277 -705 -3278 0
 3275  3276 -3277 -705  3279 0
 3275  3276 -3277 -705 -3280 0

c  2+1 --> break 
c    (-b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧  p_705) -> break
c  in CNF:
c     b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 3275 -3276  3277 -705 1162 0


c  2-1 --> 1
c    (-b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧ -p_705) -> (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0)
c  in CNF:
c     b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_2
c     b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_1
c     b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨  b^{1, 706}_0
c  in DIMACS:
 3275 -3276  3277  705 -3278 0
 3275 -3276  3277  705 -3279 0
 3275 -3276  3277  705  3280 0

c  1-1 --> 0
c    (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0 ∧ -p_705) -> (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧ -b^{1, 706}_0)
c  in CNF:
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_2
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_1
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_0
c  in DIMACS:
 3275  3276 -3277  705 -3278 0
 3275  3276 -3277  705 -3279 0
 3275  3276 -3277  705 -3280 0

c  0-1 --> -1
c    (-b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧ -p_705) -> ( b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0)
c  in CNF:
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨  b^{1, 706}_2
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_1
c     b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨  b^{1, 706}_0
c  in DIMACS:
 3275  3276  3277  705  3278 0
 3275  3276  3277  705 -3279 0
 3275  3276  3277  705  3280 0

c  -1-1 --> -2
c    ( b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧  b^{1, 705}_0 ∧ -p_705) -> ( b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0)
c  in CNF:
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨  b^{1, 706}_2
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨  b^{1, 706}_1
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨  p_705 ∨ -b^{1, 706}_0
c  in DIMACS:
-3275  3276 -3277  705  3278 0
-3275  3276 -3277  705  3279 0
-3275  3276 -3277  705 -3280 0

c  -2-1 --> break 
c    ( b^{1, 705}_2 ∧  b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨  b^{1, 705}_0 ∨  p_705 ∨ break
c  in DIMACS:
-3275 -3276  3277  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 705}_2 ∧ -b^{1, 705}_1 ∧ -b^{1, 705}_0 ∧ true) 
c  in CNF:
c    -b^{1, 705}_2 ∨  b^{1, 705}_1 ∨  b^{1, 705}_0 ∨ false 
c  in DIMACS:
-3275  3276  3277  0

c  3 does not represent an automaton state.
c    -(-b^{1, 705}_2 ∧  b^{1, 705}_1 ∧  b^{1, 705}_0 ∧ true) 
c  in CNF:
c     b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ false 
c  in DIMACS:
 3275 -3276 -3277  0
c  -3 does not represent an automaton state.
c    -( b^{1, 705}_2 ∧  b^{1, 705}_1 ∧  b^{1, 705}_0 ∧ true) 
c  in CNF:
c    -b^{1, 705}_2 ∨ -b^{1, 705}_1 ∨ -b^{1, 705}_0 ∨ false 
c  in DIMACS:
-3275 -3276 -3277  0

c i = 706
c  -2+1 --> -1
c    ( b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧  p_706) -> ( b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0)
c  in CNF:
c    -b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨  b^{1, 707}_2
c    -b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_1
c    -b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨  b^{1, 707}_0
c  in DIMACS:
-3278 -3279  3280 -706  3281 0
-3278 -3279  3280 -706 -3282 0
-3278 -3279  3280 -706  3283 0

c  -1+1 --> 0
c    ( b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0 ∧  p_706) -> (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧ -b^{1, 707}_0)
c  in CNF:
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_2
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_1
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_0
c  in DIMACS:
-3278  3279 -3280 -706 -3281 0
-3278  3279 -3280 -706 -3282 0
-3278  3279 -3280 -706 -3283 0

c  0+1 --> 1
c    (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧  p_706) -> (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0)
c  in CNF:
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_2
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_1
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨  b^{1, 707}_0
c  in DIMACS:
 3278  3279  3280 -706 -3281 0
 3278  3279  3280 -706 -3282 0
 3278  3279  3280 -706  3283 0

c  1+1 --> 2
c    (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0 ∧  p_706) -> (-b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0)
c  in CNF:
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_2
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨  b^{1, 707}_1
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ -p_706 ∨ -b^{1, 707}_0
c  in DIMACS:
 3278  3279 -3280 -706 -3281 0
 3278  3279 -3280 -706  3282 0
 3278  3279 -3280 -706 -3283 0

c  2+1 --> break 
c    (-b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧  p_706) -> break
c  in CNF:
c     b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ -p_706 ∨ break
c  in DIMACS:
 3278 -3279  3280 -706 1162 0


c  2-1 --> 1
c    (-b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧ -p_706) -> (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0)
c  in CNF:
c     b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_2
c     b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_1
c     b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨  b^{1, 707}_0
c  in DIMACS:
 3278 -3279  3280  706 -3281 0
 3278 -3279  3280  706 -3282 0
 3278 -3279  3280  706  3283 0

c  1-1 --> 0
c    (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0 ∧ -p_706) -> (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧ -b^{1, 707}_0)
c  in CNF:
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_2
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_1
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_0
c  in DIMACS:
 3278  3279 -3280  706 -3281 0
 3278  3279 -3280  706 -3282 0
 3278  3279 -3280  706 -3283 0

c  0-1 --> -1
c    (-b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧ -p_706) -> ( b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0)
c  in CNF:
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨  b^{1, 707}_2
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_1
c     b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨  b^{1, 707}_0
c  in DIMACS:
 3278  3279  3280  706  3281 0
 3278  3279  3280  706 -3282 0
 3278  3279  3280  706  3283 0

c  -1-1 --> -2
c    ( b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧  b^{1, 706}_0 ∧ -p_706) -> ( b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0)
c  in CNF:
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨  b^{1, 707}_2
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨  b^{1, 707}_1
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨  p_706 ∨ -b^{1, 707}_0
c  in DIMACS:
-3278  3279 -3280  706  3281 0
-3278  3279 -3280  706  3282 0
-3278  3279 -3280  706 -3283 0

c  -2-1 --> break 
c    ( b^{1, 706}_2 ∧  b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧ -p_706) -> break
c  in CNF:
c    -b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨  b^{1, 706}_0 ∨  p_706 ∨ break
c  in DIMACS:
-3278 -3279  3280  706 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 706}_2 ∧ -b^{1, 706}_1 ∧ -b^{1, 706}_0 ∧ true) 
c  in CNF:
c    -b^{1, 706}_2 ∨  b^{1, 706}_1 ∨  b^{1, 706}_0 ∨ false 
c  in DIMACS:
-3278  3279  3280  0

c  3 does not represent an automaton state.
c    -(-b^{1, 706}_2 ∧  b^{1, 706}_1 ∧  b^{1, 706}_0 ∧ true) 
c  in CNF:
c     b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ false 
c  in DIMACS:
 3278 -3279 -3280  0
c  -3 does not represent an automaton state.
c    -( b^{1, 706}_2 ∧  b^{1, 706}_1 ∧  b^{1, 706}_0 ∧ true) 
c  in CNF:
c    -b^{1, 706}_2 ∨ -b^{1, 706}_1 ∨ -b^{1, 706}_0 ∨ false 
c  in DIMACS:
-3278 -3279 -3280  0

c i = 707
c  -2+1 --> -1
c    ( b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧  p_707) -> ( b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0)
c  in CNF:
c    -b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨  b^{1, 708}_2
c    -b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_1
c    -b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨  b^{1, 708}_0
c  in DIMACS:
-3281 -3282  3283 -707  3284 0
-3281 -3282  3283 -707 -3285 0
-3281 -3282  3283 -707  3286 0

c  -1+1 --> 0
c    ( b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0 ∧  p_707) -> (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧ -b^{1, 708}_0)
c  in CNF:
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_2
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_1
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_0
c  in DIMACS:
-3281  3282 -3283 -707 -3284 0
-3281  3282 -3283 -707 -3285 0
-3281  3282 -3283 -707 -3286 0

c  0+1 --> 1
c    (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧  p_707) -> (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0)
c  in CNF:
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_2
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_1
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨  b^{1, 708}_0
c  in DIMACS:
 3281  3282  3283 -707 -3284 0
 3281  3282  3283 -707 -3285 0
 3281  3282  3283 -707  3286 0

c  1+1 --> 2
c    (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0 ∧  p_707) -> (-b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0)
c  in CNF:
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_2
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨  b^{1, 708}_1
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ -p_707 ∨ -b^{1, 708}_0
c  in DIMACS:
 3281  3282 -3283 -707 -3284 0
 3281  3282 -3283 -707  3285 0
 3281  3282 -3283 -707 -3286 0

c  2+1 --> break 
c    (-b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧  p_707) -> break
c  in CNF:
c     b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ -p_707 ∨ break
c  in DIMACS:
 3281 -3282  3283 -707 1162 0


c  2-1 --> 1
c    (-b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧ -p_707) -> (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0)
c  in CNF:
c     b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_2
c     b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_1
c     b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨  b^{1, 708}_0
c  in DIMACS:
 3281 -3282  3283  707 -3284 0
 3281 -3282  3283  707 -3285 0
 3281 -3282  3283  707  3286 0

c  1-1 --> 0
c    (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0 ∧ -p_707) -> (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧ -b^{1, 708}_0)
c  in CNF:
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_2
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_1
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_0
c  in DIMACS:
 3281  3282 -3283  707 -3284 0
 3281  3282 -3283  707 -3285 0
 3281  3282 -3283  707 -3286 0

c  0-1 --> -1
c    (-b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧ -p_707) -> ( b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0)
c  in CNF:
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨  b^{1, 708}_2
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_1
c     b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨  b^{1, 708}_0
c  in DIMACS:
 3281  3282  3283  707  3284 0
 3281  3282  3283  707 -3285 0
 3281  3282  3283  707  3286 0

c  -1-1 --> -2
c    ( b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧  b^{1, 707}_0 ∧ -p_707) -> ( b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0)
c  in CNF:
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨  b^{1, 708}_2
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨  b^{1, 708}_1
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨  p_707 ∨ -b^{1, 708}_0
c  in DIMACS:
-3281  3282 -3283  707  3284 0
-3281  3282 -3283  707  3285 0
-3281  3282 -3283  707 -3286 0

c  -2-1 --> break 
c    ( b^{1, 707}_2 ∧  b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧ -p_707) -> break
c  in CNF:
c    -b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨  b^{1, 707}_0 ∨  p_707 ∨ break
c  in DIMACS:
-3281 -3282  3283  707 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 707}_2 ∧ -b^{1, 707}_1 ∧ -b^{1, 707}_0 ∧ true) 
c  in CNF:
c    -b^{1, 707}_2 ∨  b^{1, 707}_1 ∨  b^{1, 707}_0 ∨ false 
c  in DIMACS:
-3281  3282  3283  0

c  3 does not represent an automaton state.
c    -(-b^{1, 707}_2 ∧  b^{1, 707}_1 ∧  b^{1, 707}_0 ∧ true) 
c  in CNF:
c     b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ false 
c  in DIMACS:
 3281 -3282 -3283  0
c  -3 does not represent an automaton state.
c    -( b^{1, 707}_2 ∧  b^{1, 707}_1 ∧  b^{1, 707}_0 ∧ true) 
c  in CNF:
c    -b^{1, 707}_2 ∨ -b^{1, 707}_1 ∨ -b^{1, 707}_0 ∨ false 
c  in DIMACS:
-3281 -3282 -3283  0

c i = 708
c  -2+1 --> -1
c    ( b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧  p_708) -> ( b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0)
c  in CNF:
c    -b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨  b^{1, 709}_2
c    -b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_1
c    -b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨  b^{1, 709}_0
c  in DIMACS:
-3284 -3285  3286 -708  3287 0
-3284 -3285  3286 -708 -3288 0
-3284 -3285  3286 -708  3289 0

c  -1+1 --> 0
c    ( b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0 ∧  p_708) -> (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧ -b^{1, 709}_0)
c  in CNF:
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_2
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_1
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_0
c  in DIMACS:
-3284  3285 -3286 -708 -3287 0
-3284  3285 -3286 -708 -3288 0
-3284  3285 -3286 -708 -3289 0

c  0+1 --> 1
c    (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧  p_708) -> (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0)
c  in CNF:
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_2
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_1
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨  b^{1, 709}_0
c  in DIMACS:
 3284  3285  3286 -708 -3287 0
 3284  3285  3286 -708 -3288 0
 3284  3285  3286 -708  3289 0

c  1+1 --> 2
c    (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0 ∧  p_708) -> (-b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0)
c  in CNF:
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_2
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨  b^{1, 709}_1
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ -p_708 ∨ -b^{1, 709}_0
c  in DIMACS:
 3284  3285 -3286 -708 -3287 0
 3284  3285 -3286 -708  3288 0
 3284  3285 -3286 -708 -3289 0

c  2+1 --> break 
c    (-b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧  p_708) -> break
c  in CNF:
c     b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 3284 -3285  3286 -708 1162 0


c  2-1 --> 1
c    (-b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧ -p_708) -> (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0)
c  in CNF:
c     b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_2
c     b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_1
c     b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨  b^{1, 709}_0
c  in DIMACS:
 3284 -3285  3286  708 -3287 0
 3284 -3285  3286  708 -3288 0
 3284 -3285  3286  708  3289 0

c  1-1 --> 0
c    (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0 ∧ -p_708) -> (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧ -b^{1, 709}_0)
c  in CNF:
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_2
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_1
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_0
c  in DIMACS:
 3284  3285 -3286  708 -3287 0
 3284  3285 -3286  708 -3288 0
 3284  3285 -3286  708 -3289 0

c  0-1 --> -1
c    (-b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧ -p_708) -> ( b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0)
c  in CNF:
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨  b^{1, 709}_2
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_1
c     b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨  b^{1, 709}_0
c  in DIMACS:
 3284  3285  3286  708  3287 0
 3284  3285  3286  708 -3288 0
 3284  3285  3286  708  3289 0

c  -1-1 --> -2
c    ( b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧  b^{1, 708}_0 ∧ -p_708) -> ( b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0)
c  in CNF:
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨  b^{1, 709}_2
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨  b^{1, 709}_1
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨  p_708 ∨ -b^{1, 709}_0
c  in DIMACS:
-3284  3285 -3286  708  3287 0
-3284  3285 -3286  708  3288 0
-3284  3285 -3286  708 -3289 0

c  -2-1 --> break 
c    ( b^{1, 708}_2 ∧  b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨  b^{1, 708}_0 ∨  p_708 ∨ break
c  in DIMACS:
-3284 -3285  3286  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 708}_2 ∧ -b^{1, 708}_1 ∧ -b^{1, 708}_0 ∧ true) 
c  in CNF:
c    -b^{1, 708}_2 ∨  b^{1, 708}_1 ∨  b^{1, 708}_0 ∨ false 
c  in DIMACS:
-3284  3285  3286  0

c  3 does not represent an automaton state.
c    -(-b^{1, 708}_2 ∧  b^{1, 708}_1 ∧  b^{1, 708}_0 ∧ true) 
c  in CNF:
c     b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ false 
c  in DIMACS:
 3284 -3285 -3286  0
c  -3 does not represent an automaton state.
c    -( b^{1, 708}_2 ∧  b^{1, 708}_1 ∧  b^{1, 708}_0 ∧ true) 
c  in CNF:
c    -b^{1, 708}_2 ∨ -b^{1, 708}_1 ∨ -b^{1, 708}_0 ∨ false 
c  in DIMACS:
-3284 -3285 -3286  0

c i = 709
c  -2+1 --> -1
c    ( b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧  p_709) -> ( b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0)
c  in CNF:
c    -b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨  b^{1, 710}_2
c    -b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_1
c    -b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨  b^{1, 710}_0
c  in DIMACS:
-3287 -3288  3289 -709  3290 0
-3287 -3288  3289 -709 -3291 0
-3287 -3288  3289 -709  3292 0

c  -1+1 --> 0
c    ( b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0 ∧  p_709) -> (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧ -b^{1, 710}_0)
c  in CNF:
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_2
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_1
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_0
c  in DIMACS:
-3287  3288 -3289 -709 -3290 0
-3287  3288 -3289 -709 -3291 0
-3287  3288 -3289 -709 -3292 0

c  0+1 --> 1
c    (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧  p_709) -> (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0)
c  in CNF:
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_2
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_1
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨  b^{1, 710}_0
c  in DIMACS:
 3287  3288  3289 -709 -3290 0
 3287  3288  3289 -709 -3291 0
 3287  3288  3289 -709  3292 0

c  1+1 --> 2
c    (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0 ∧  p_709) -> (-b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0)
c  in CNF:
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_2
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨  b^{1, 710}_1
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ -p_709 ∨ -b^{1, 710}_0
c  in DIMACS:
 3287  3288 -3289 -709 -3290 0
 3287  3288 -3289 -709  3291 0
 3287  3288 -3289 -709 -3292 0

c  2+1 --> break 
c    (-b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧  p_709) -> break
c  in CNF:
c     b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ -p_709 ∨ break
c  in DIMACS:
 3287 -3288  3289 -709 1162 0


c  2-1 --> 1
c    (-b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧ -p_709) -> (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0)
c  in CNF:
c     b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_2
c     b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_1
c     b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨  b^{1, 710}_0
c  in DIMACS:
 3287 -3288  3289  709 -3290 0
 3287 -3288  3289  709 -3291 0
 3287 -3288  3289  709  3292 0

c  1-1 --> 0
c    (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0 ∧ -p_709) -> (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧ -b^{1, 710}_0)
c  in CNF:
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_2
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_1
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_0
c  in DIMACS:
 3287  3288 -3289  709 -3290 0
 3287  3288 -3289  709 -3291 0
 3287  3288 -3289  709 -3292 0

c  0-1 --> -1
c    (-b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧ -p_709) -> ( b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0)
c  in CNF:
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨  b^{1, 710}_2
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_1
c     b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨  b^{1, 710}_0
c  in DIMACS:
 3287  3288  3289  709  3290 0
 3287  3288  3289  709 -3291 0
 3287  3288  3289  709  3292 0

c  -1-1 --> -2
c    ( b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧  b^{1, 709}_0 ∧ -p_709) -> ( b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0)
c  in CNF:
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨  b^{1, 710}_2
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨  b^{1, 710}_1
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨  p_709 ∨ -b^{1, 710}_0
c  in DIMACS:
-3287  3288 -3289  709  3290 0
-3287  3288 -3289  709  3291 0
-3287  3288 -3289  709 -3292 0

c  -2-1 --> break 
c    ( b^{1, 709}_2 ∧  b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧ -p_709) -> break
c  in CNF:
c    -b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨  b^{1, 709}_0 ∨  p_709 ∨ break
c  in DIMACS:
-3287 -3288  3289  709 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 709}_2 ∧ -b^{1, 709}_1 ∧ -b^{1, 709}_0 ∧ true) 
c  in CNF:
c    -b^{1, 709}_2 ∨  b^{1, 709}_1 ∨  b^{1, 709}_0 ∨ false 
c  in DIMACS:
-3287  3288  3289  0

c  3 does not represent an automaton state.
c    -(-b^{1, 709}_2 ∧  b^{1, 709}_1 ∧  b^{1, 709}_0 ∧ true) 
c  in CNF:
c     b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ false 
c  in DIMACS:
 3287 -3288 -3289  0
c  -3 does not represent an automaton state.
c    -( b^{1, 709}_2 ∧  b^{1, 709}_1 ∧  b^{1, 709}_0 ∧ true) 
c  in CNF:
c    -b^{1, 709}_2 ∨ -b^{1, 709}_1 ∨ -b^{1, 709}_0 ∨ false 
c  in DIMACS:
-3287 -3288 -3289  0

c i = 710
c  -2+1 --> -1
c    ( b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧  p_710) -> ( b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0)
c  in CNF:
c    -b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨  b^{1, 711}_2
c    -b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_1
c    -b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨  b^{1, 711}_0
c  in DIMACS:
-3290 -3291  3292 -710  3293 0
-3290 -3291  3292 -710 -3294 0
-3290 -3291  3292 -710  3295 0

c  -1+1 --> 0
c    ( b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0 ∧  p_710) -> (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧ -b^{1, 711}_0)
c  in CNF:
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_2
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_1
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_0
c  in DIMACS:
-3290  3291 -3292 -710 -3293 0
-3290  3291 -3292 -710 -3294 0
-3290  3291 -3292 -710 -3295 0

c  0+1 --> 1
c    (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧  p_710) -> (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0)
c  in CNF:
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_2
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_1
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨  b^{1, 711}_0
c  in DIMACS:
 3290  3291  3292 -710 -3293 0
 3290  3291  3292 -710 -3294 0
 3290  3291  3292 -710  3295 0

c  1+1 --> 2
c    (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0 ∧  p_710) -> (-b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0)
c  in CNF:
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_2
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨  b^{1, 711}_1
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ -p_710 ∨ -b^{1, 711}_0
c  in DIMACS:
 3290  3291 -3292 -710 -3293 0
 3290  3291 -3292 -710  3294 0
 3290  3291 -3292 -710 -3295 0

c  2+1 --> break 
c    (-b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧  p_710) -> break
c  in CNF:
c     b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 3290 -3291  3292 -710 1162 0


c  2-1 --> 1
c    (-b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧ -p_710) -> (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0)
c  in CNF:
c     b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_2
c     b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_1
c     b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨  b^{1, 711}_0
c  in DIMACS:
 3290 -3291  3292  710 -3293 0
 3290 -3291  3292  710 -3294 0
 3290 -3291  3292  710  3295 0

c  1-1 --> 0
c    (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0 ∧ -p_710) -> (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧ -b^{1, 711}_0)
c  in CNF:
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_2
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_1
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_0
c  in DIMACS:
 3290  3291 -3292  710 -3293 0
 3290  3291 -3292  710 -3294 0
 3290  3291 -3292  710 -3295 0

c  0-1 --> -1
c    (-b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧ -p_710) -> ( b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0)
c  in CNF:
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨  b^{1, 711}_2
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_1
c     b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨  b^{1, 711}_0
c  in DIMACS:
 3290  3291  3292  710  3293 0
 3290  3291  3292  710 -3294 0
 3290  3291  3292  710  3295 0

c  -1-1 --> -2
c    ( b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧  b^{1, 710}_0 ∧ -p_710) -> ( b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0)
c  in CNF:
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨  b^{1, 711}_2
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨  b^{1, 711}_1
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨  p_710 ∨ -b^{1, 711}_0
c  in DIMACS:
-3290  3291 -3292  710  3293 0
-3290  3291 -3292  710  3294 0
-3290  3291 -3292  710 -3295 0

c  -2-1 --> break 
c    ( b^{1, 710}_2 ∧  b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨  b^{1, 710}_0 ∨  p_710 ∨ break
c  in DIMACS:
-3290 -3291  3292  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 710}_2 ∧ -b^{1, 710}_1 ∧ -b^{1, 710}_0 ∧ true) 
c  in CNF:
c    -b^{1, 710}_2 ∨  b^{1, 710}_1 ∨  b^{1, 710}_0 ∨ false 
c  in DIMACS:
-3290  3291  3292  0

c  3 does not represent an automaton state.
c    -(-b^{1, 710}_2 ∧  b^{1, 710}_1 ∧  b^{1, 710}_0 ∧ true) 
c  in CNF:
c     b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ false 
c  in DIMACS:
 3290 -3291 -3292  0
c  -3 does not represent an automaton state.
c    -( b^{1, 710}_2 ∧  b^{1, 710}_1 ∧  b^{1, 710}_0 ∧ true) 
c  in CNF:
c    -b^{1, 710}_2 ∨ -b^{1, 710}_1 ∨ -b^{1, 710}_0 ∨ false 
c  in DIMACS:
-3290 -3291 -3292  0

c i = 711
c  -2+1 --> -1
c    ( b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧  p_711) -> ( b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0)
c  in CNF:
c    -b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨  b^{1, 712}_2
c    -b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_1
c    -b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨  b^{1, 712}_0
c  in DIMACS:
-3293 -3294  3295 -711  3296 0
-3293 -3294  3295 -711 -3297 0
-3293 -3294  3295 -711  3298 0

c  -1+1 --> 0
c    ( b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0 ∧  p_711) -> (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧ -b^{1, 712}_0)
c  in CNF:
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_2
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_1
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_0
c  in DIMACS:
-3293  3294 -3295 -711 -3296 0
-3293  3294 -3295 -711 -3297 0
-3293  3294 -3295 -711 -3298 0

c  0+1 --> 1
c    (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧  p_711) -> (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0)
c  in CNF:
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_2
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_1
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨  b^{1, 712}_0
c  in DIMACS:
 3293  3294  3295 -711 -3296 0
 3293  3294  3295 -711 -3297 0
 3293  3294  3295 -711  3298 0

c  1+1 --> 2
c    (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0 ∧  p_711) -> (-b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0)
c  in CNF:
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_2
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨  b^{1, 712}_1
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ -p_711 ∨ -b^{1, 712}_0
c  in DIMACS:
 3293  3294 -3295 -711 -3296 0
 3293  3294 -3295 -711  3297 0
 3293  3294 -3295 -711 -3298 0

c  2+1 --> break 
c    (-b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧  p_711) -> break
c  in CNF:
c     b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ -p_711 ∨ break
c  in DIMACS:
 3293 -3294  3295 -711 1162 0


c  2-1 --> 1
c    (-b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧ -p_711) -> (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0)
c  in CNF:
c     b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_2
c     b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_1
c     b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨  b^{1, 712}_0
c  in DIMACS:
 3293 -3294  3295  711 -3296 0
 3293 -3294  3295  711 -3297 0
 3293 -3294  3295  711  3298 0

c  1-1 --> 0
c    (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0 ∧ -p_711) -> (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧ -b^{1, 712}_0)
c  in CNF:
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_2
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_1
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_0
c  in DIMACS:
 3293  3294 -3295  711 -3296 0
 3293  3294 -3295  711 -3297 0
 3293  3294 -3295  711 -3298 0

c  0-1 --> -1
c    (-b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧ -p_711) -> ( b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0)
c  in CNF:
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨  b^{1, 712}_2
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_1
c     b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨  b^{1, 712}_0
c  in DIMACS:
 3293  3294  3295  711  3296 0
 3293  3294  3295  711 -3297 0
 3293  3294  3295  711  3298 0

c  -1-1 --> -2
c    ( b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧  b^{1, 711}_0 ∧ -p_711) -> ( b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0)
c  in CNF:
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨  b^{1, 712}_2
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨  b^{1, 712}_1
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨  p_711 ∨ -b^{1, 712}_0
c  in DIMACS:
-3293  3294 -3295  711  3296 0
-3293  3294 -3295  711  3297 0
-3293  3294 -3295  711 -3298 0

c  -2-1 --> break 
c    ( b^{1, 711}_2 ∧  b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧ -p_711) -> break
c  in CNF:
c    -b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨  b^{1, 711}_0 ∨  p_711 ∨ break
c  in DIMACS:
-3293 -3294  3295  711 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 711}_2 ∧ -b^{1, 711}_1 ∧ -b^{1, 711}_0 ∧ true) 
c  in CNF:
c    -b^{1, 711}_2 ∨  b^{1, 711}_1 ∨  b^{1, 711}_0 ∨ false 
c  in DIMACS:
-3293  3294  3295  0

c  3 does not represent an automaton state.
c    -(-b^{1, 711}_2 ∧  b^{1, 711}_1 ∧  b^{1, 711}_0 ∧ true) 
c  in CNF:
c     b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ false 
c  in DIMACS:
 3293 -3294 -3295  0
c  -3 does not represent an automaton state.
c    -( b^{1, 711}_2 ∧  b^{1, 711}_1 ∧  b^{1, 711}_0 ∧ true) 
c  in CNF:
c    -b^{1, 711}_2 ∨ -b^{1, 711}_1 ∨ -b^{1, 711}_0 ∨ false 
c  in DIMACS:
-3293 -3294 -3295  0

c i = 712
c  -2+1 --> -1
c    ( b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧  p_712) -> ( b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0)
c  in CNF:
c    -b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨  b^{1, 713}_2
c    -b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_1
c    -b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨  b^{1, 713}_0
c  in DIMACS:
-3296 -3297  3298 -712  3299 0
-3296 -3297  3298 -712 -3300 0
-3296 -3297  3298 -712  3301 0

c  -1+1 --> 0
c    ( b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0 ∧  p_712) -> (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧ -b^{1, 713}_0)
c  in CNF:
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_2
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_1
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_0
c  in DIMACS:
-3296  3297 -3298 -712 -3299 0
-3296  3297 -3298 -712 -3300 0
-3296  3297 -3298 -712 -3301 0

c  0+1 --> 1
c    (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧  p_712) -> (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0)
c  in CNF:
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_2
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_1
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨  b^{1, 713}_0
c  in DIMACS:
 3296  3297  3298 -712 -3299 0
 3296  3297  3298 -712 -3300 0
 3296  3297  3298 -712  3301 0

c  1+1 --> 2
c    (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0 ∧  p_712) -> (-b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0)
c  in CNF:
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_2
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨  b^{1, 713}_1
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ -p_712 ∨ -b^{1, 713}_0
c  in DIMACS:
 3296  3297 -3298 -712 -3299 0
 3296  3297 -3298 -712  3300 0
 3296  3297 -3298 -712 -3301 0

c  2+1 --> break 
c    (-b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧  p_712) -> break
c  in CNF:
c     b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 3296 -3297  3298 -712 1162 0


c  2-1 --> 1
c    (-b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧ -p_712) -> (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0)
c  in CNF:
c     b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_2
c     b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_1
c     b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨  b^{1, 713}_0
c  in DIMACS:
 3296 -3297  3298  712 -3299 0
 3296 -3297  3298  712 -3300 0
 3296 -3297  3298  712  3301 0

c  1-1 --> 0
c    (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0 ∧ -p_712) -> (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧ -b^{1, 713}_0)
c  in CNF:
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_2
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_1
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_0
c  in DIMACS:
 3296  3297 -3298  712 -3299 0
 3296  3297 -3298  712 -3300 0
 3296  3297 -3298  712 -3301 0

c  0-1 --> -1
c    (-b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧ -p_712) -> ( b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0)
c  in CNF:
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨  b^{1, 713}_2
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_1
c     b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨  b^{1, 713}_0
c  in DIMACS:
 3296  3297  3298  712  3299 0
 3296  3297  3298  712 -3300 0
 3296  3297  3298  712  3301 0

c  -1-1 --> -2
c    ( b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧  b^{1, 712}_0 ∧ -p_712) -> ( b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0)
c  in CNF:
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨  b^{1, 713}_2
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨  b^{1, 713}_1
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨  p_712 ∨ -b^{1, 713}_0
c  in DIMACS:
-3296  3297 -3298  712  3299 0
-3296  3297 -3298  712  3300 0
-3296  3297 -3298  712 -3301 0

c  -2-1 --> break 
c    ( b^{1, 712}_2 ∧  b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨  b^{1, 712}_0 ∨  p_712 ∨ break
c  in DIMACS:
-3296 -3297  3298  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 712}_2 ∧ -b^{1, 712}_1 ∧ -b^{1, 712}_0 ∧ true) 
c  in CNF:
c    -b^{1, 712}_2 ∨  b^{1, 712}_1 ∨  b^{1, 712}_0 ∨ false 
c  in DIMACS:
-3296  3297  3298  0

c  3 does not represent an automaton state.
c    -(-b^{1, 712}_2 ∧  b^{1, 712}_1 ∧  b^{1, 712}_0 ∧ true) 
c  in CNF:
c     b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ false 
c  in DIMACS:
 3296 -3297 -3298  0
c  -3 does not represent an automaton state.
c    -( b^{1, 712}_2 ∧  b^{1, 712}_1 ∧  b^{1, 712}_0 ∧ true) 
c  in CNF:
c    -b^{1, 712}_2 ∨ -b^{1, 712}_1 ∨ -b^{1, 712}_0 ∨ false 
c  in DIMACS:
-3296 -3297 -3298  0

c i = 713
c  -2+1 --> -1
c    ( b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧  p_713) -> ( b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0)
c  in CNF:
c    -b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨  b^{1, 714}_2
c    -b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_1
c    -b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨  b^{1, 714}_0
c  in DIMACS:
-3299 -3300  3301 -713  3302 0
-3299 -3300  3301 -713 -3303 0
-3299 -3300  3301 -713  3304 0

c  -1+1 --> 0
c    ( b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0 ∧  p_713) -> (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧ -b^{1, 714}_0)
c  in CNF:
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_2
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_1
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_0
c  in DIMACS:
-3299  3300 -3301 -713 -3302 0
-3299  3300 -3301 -713 -3303 0
-3299  3300 -3301 -713 -3304 0

c  0+1 --> 1
c    (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧  p_713) -> (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0)
c  in CNF:
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_2
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_1
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨  b^{1, 714}_0
c  in DIMACS:
 3299  3300  3301 -713 -3302 0
 3299  3300  3301 -713 -3303 0
 3299  3300  3301 -713  3304 0

c  1+1 --> 2
c    (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0 ∧  p_713) -> (-b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0)
c  in CNF:
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_2
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨  b^{1, 714}_1
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ -p_713 ∨ -b^{1, 714}_0
c  in DIMACS:
 3299  3300 -3301 -713 -3302 0
 3299  3300 -3301 -713  3303 0
 3299  3300 -3301 -713 -3304 0

c  2+1 --> break 
c    (-b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧  p_713) -> break
c  in CNF:
c     b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ -p_713 ∨ break
c  in DIMACS:
 3299 -3300  3301 -713 1162 0


c  2-1 --> 1
c    (-b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧ -p_713) -> (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0)
c  in CNF:
c     b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_2
c     b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_1
c     b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨  b^{1, 714}_0
c  in DIMACS:
 3299 -3300  3301  713 -3302 0
 3299 -3300  3301  713 -3303 0
 3299 -3300  3301  713  3304 0

c  1-1 --> 0
c    (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0 ∧ -p_713) -> (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧ -b^{1, 714}_0)
c  in CNF:
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_2
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_1
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_0
c  in DIMACS:
 3299  3300 -3301  713 -3302 0
 3299  3300 -3301  713 -3303 0
 3299  3300 -3301  713 -3304 0

c  0-1 --> -1
c    (-b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧ -p_713) -> ( b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0)
c  in CNF:
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨  b^{1, 714}_2
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_1
c     b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨  b^{1, 714}_0
c  in DIMACS:
 3299  3300  3301  713  3302 0
 3299  3300  3301  713 -3303 0
 3299  3300  3301  713  3304 0

c  -1-1 --> -2
c    ( b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧  b^{1, 713}_0 ∧ -p_713) -> ( b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0)
c  in CNF:
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨  b^{1, 714}_2
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨  b^{1, 714}_1
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨  p_713 ∨ -b^{1, 714}_0
c  in DIMACS:
-3299  3300 -3301  713  3302 0
-3299  3300 -3301  713  3303 0
-3299  3300 -3301  713 -3304 0

c  -2-1 --> break 
c    ( b^{1, 713}_2 ∧  b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧ -p_713) -> break
c  in CNF:
c    -b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨  b^{1, 713}_0 ∨  p_713 ∨ break
c  in DIMACS:
-3299 -3300  3301  713 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 713}_2 ∧ -b^{1, 713}_1 ∧ -b^{1, 713}_0 ∧ true) 
c  in CNF:
c    -b^{1, 713}_2 ∨  b^{1, 713}_1 ∨  b^{1, 713}_0 ∨ false 
c  in DIMACS:
-3299  3300  3301  0

c  3 does not represent an automaton state.
c    -(-b^{1, 713}_2 ∧  b^{1, 713}_1 ∧  b^{1, 713}_0 ∧ true) 
c  in CNF:
c     b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ false 
c  in DIMACS:
 3299 -3300 -3301  0
c  -3 does not represent an automaton state.
c    -( b^{1, 713}_2 ∧  b^{1, 713}_1 ∧  b^{1, 713}_0 ∧ true) 
c  in CNF:
c    -b^{1, 713}_2 ∨ -b^{1, 713}_1 ∨ -b^{1, 713}_0 ∨ false 
c  in DIMACS:
-3299 -3300 -3301  0

c i = 714
c  -2+1 --> -1
c    ( b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧  p_714) -> ( b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0)
c  in CNF:
c    -b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨  b^{1, 715}_2
c    -b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_1
c    -b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨  b^{1, 715}_0
c  in DIMACS:
-3302 -3303  3304 -714  3305 0
-3302 -3303  3304 -714 -3306 0
-3302 -3303  3304 -714  3307 0

c  -1+1 --> 0
c    ( b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0 ∧  p_714) -> (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧ -b^{1, 715}_0)
c  in CNF:
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_2
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_1
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_0
c  in DIMACS:
-3302  3303 -3304 -714 -3305 0
-3302  3303 -3304 -714 -3306 0
-3302  3303 -3304 -714 -3307 0

c  0+1 --> 1
c    (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧  p_714) -> (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0)
c  in CNF:
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_2
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_1
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨  b^{1, 715}_0
c  in DIMACS:
 3302  3303  3304 -714 -3305 0
 3302  3303  3304 -714 -3306 0
 3302  3303  3304 -714  3307 0

c  1+1 --> 2
c    (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0 ∧  p_714) -> (-b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0)
c  in CNF:
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_2
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨  b^{1, 715}_1
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ -p_714 ∨ -b^{1, 715}_0
c  in DIMACS:
 3302  3303 -3304 -714 -3305 0
 3302  3303 -3304 -714  3306 0
 3302  3303 -3304 -714 -3307 0

c  2+1 --> break 
c    (-b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧  p_714) -> break
c  in CNF:
c     b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 3302 -3303  3304 -714 1162 0


c  2-1 --> 1
c    (-b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧ -p_714) -> (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0)
c  in CNF:
c     b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_2
c     b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_1
c     b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨  b^{1, 715}_0
c  in DIMACS:
 3302 -3303  3304  714 -3305 0
 3302 -3303  3304  714 -3306 0
 3302 -3303  3304  714  3307 0

c  1-1 --> 0
c    (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0 ∧ -p_714) -> (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧ -b^{1, 715}_0)
c  in CNF:
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_2
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_1
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_0
c  in DIMACS:
 3302  3303 -3304  714 -3305 0
 3302  3303 -3304  714 -3306 0
 3302  3303 -3304  714 -3307 0

c  0-1 --> -1
c    (-b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧ -p_714) -> ( b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0)
c  in CNF:
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨  b^{1, 715}_2
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_1
c     b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨  b^{1, 715}_0
c  in DIMACS:
 3302  3303  3304  714  3305 0
 3302  3303  3304  714 -3306 0
 3302  3303  3304  714  3307 0

c  -1-1 --> -2
c    ( b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧  b^{1, 714}_0 ∧ -p_714) -> ( b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0)
c  in CNF:
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨  b^{1, 715}_2
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨  b^{1, 715}_1
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨  p_714 ∨ -b^{1, 715}_0
c  in DIMACS:
-3302  3303 -3304  714  3305 0
-3302  3303 -3304  714  3306 0
-3302  3303 -3304  714 -3307 0

c  -2-1 --> break 
c    ( b^{1, 714}_2 ∧  b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨  b^{1, 714}_0 ∨  p_714 ∨ break
c  in DIMACS:
-3302 -3303  3304  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 714}_2 ∧ -b^{1, 714}_1 ∧ -b^{1, 714}_0 ∧ true) 
c  in CNF:
c    -b^{1, 714}_2 ∨  b^{1, 714}_1 ∨  b^{1, 714}_0 ∨ false 
c  in DIMACS:
-3302  3303  3304  0

c  3 does not represent an automaton state.
c    -(-b^{1, 714}_2 ∧  b^{1, 714}_1 ∧  b^{1, 714}_0 ∧ true) 
c  in CNF:
c     b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ false 
c  in DIMACS:
 3302 -3303 -3304  0
c  -3 does not represent an automaton state.
c    -( b^{1, 714}_2 ∧  b^{1, 714}_1 ∧  b^{1, 714}_0 ∧ true) 
c  in CNF:
c    -b^{1, 714}_2 ∨ -b^{1, 714}_1 ∨ -b^{1, 714}_0 ∨ false 
c  in DIMACS:
-3302 -3303 -3304  0

c i = 715
c  -2+1 --> -1
c    ( b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧  p_715) -> ( b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0)
c  in CNF:
c    -b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨  b^{1, 716}_2
c    -b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_1
c    -b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨  b^{1, 716}_0
c  in DIMACS:
-3305 -3306  3307 -715  3308 0
-3305 -3306  3307 -715 -3309 0
-3305 -3306  3307 -715  3310 0

c  -1+1 --> 0
c    ( b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0 ∧  p_715) -> (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧ -b^{1, 716}_0)
c  in CNF:
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_2
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_1
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_0
c  in DIMACS:
-3305  3306 -3307 -715 -3308 0
-3305  3306 -3307 -715 -3309 0
-3305  3306 -3307 -715 -3310 0

c  0+1 --> 1
c    (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧  p_715) -> (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0)
c  in CNF:
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_2
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_1
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨  b^{1, 716}_0
c  in DIMACS:
 3305  3306  3307 -715 -3308 0
 3305  3306  3307 -715 -3309 0
 3305  3306  3307 -715  3310 0

c  1+1 --> 2
c    (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0 ∧  p_715) -> (-b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0)
c  in CNF:
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_2
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨  b^{1, 716}_1
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ -p_715 ∨ -b^{1, 716}_0
c  in DIMACS:
 3305  3306 -3307 -715 -3308 0
 3305  3306 -3307 -715  3309 0
 3305  3306 -3307 -715 -3310 0

c  2+1 --> break 
c    (-b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧  p_715) -> break
c  in CNF:
c     b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 3305 -3306  3307 -715 1162 0


c  2-1 --> 1
c    (-b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧ -p_715) -> (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0)
c  in CNF:
c     b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_2
c     b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_1
c     b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨  b^{1, 716}_0
c  in DIMACS:
 3305 -3306  3307  715 -3308 0
 3305 -3306  3307  715 -3309 0
 3305 -3306  3307  715  3310 0

c  1-1 --> 0
c    (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0 ∧ -p_715) -> (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧ -b^{1, 716}_0)
c  in CNF:
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_2
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_1
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_0
c  in DIMACS:
 3305  3306 -3307  715 -3308 0
 3305  3306 -3307  715 -3309 0
 3305  3306 -3307  715 -3310 0

c  0-1 --> -1
c    (-b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧ -p_715) -> ( b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0)
c  in CNF:
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨  b^{1, 716}_2
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_1
c     b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨  b^{1, 716}_0
c  in DIMACS:
 3305  3306  3307  715  3308 0
 3305  3306  3307  715 -3309 0
 3305  3306  3307  715  3310 0

c  -1-1 --> -2
c    ( b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧  b^{1, 715}_0 ∧ -p_715) -> ( b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0)
c  in CNF:
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨  b^{1, 716}_2
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨  b^{1, 716}_1
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨  p_715 ∨ -b^{1, 716}_0
c  in DIMACS:
-3305  3306 -3307  715  3308 0
-3305  3306 -3307  715  3309 0
-3305  3306 -3307  715 -3310 0

c  -2-1 --> break 
c    ( b^{1, 715}_2 ∧  b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨  b^{1, 715}_0 ∨  p_715 ∨ break
c  in DIMACS:
-3305 -3306  3307  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 715}_2 ∧ -b^{1, 715}_1 ∧ -b^{1, 715}_0 ∧ true) 
c  in CNF:
c    -b^{1, 715}_2 ∨  b^{1, 715}_1 ∨  b^{1, 715}_0 ∨ false 
c  in DIMACS:
-3305  3306  3307  0

c  3 does not represent an automaton state.
c    -(-b^{1, 715}_2 ∧  b^{1, 715}_1 ∧  b^{1, 715}_0 ∧ true) 
c  in CNF:
c     b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ false 
c  in DIMACS:
 3305 -3306 -3307  0
c  -3 does not represent an automaton state.
c    -( b^{1, 715}_2 ∧  b^{1, 715}_1 ∧  b^{1, 715}_0 ∧ true) 
c  in CNF:
c    -b^{1, 715}_2 ∨ -b^{1, 715}_1 ∨ -b^{1, 715}_0 ∨ false 
c  in DIMACS:
-3305 -3306 -3307  0

c i = 716
c  -2+1 --> -1
c    ( b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧  p_716) -> ( b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0)
c  in CNF:
c    -b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨  b^{1, 717}_2
c    -b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_1
c    -b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨  b^{1, 717}_0
c  in DIMACS:
-3308 -3309  3310 -716  3311 0
-3308 -3309  3310 -716 -3312 0
-3308 -3309  3310 -716  3313 0

c  -1+1 --> 0
c    ( b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0 ∧  p_716) -> (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧ -b^{1, 717}_0)
c  in CNF:
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_2
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_1
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_0
c  in DIMACS:
-3308  3309 -3310 -716 -3311 0
-3308  3309 -3310 -716 -3312 0
-3308  3309 -3310 -716 -3313 0

c  0+1 --> 1
c    (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧  p_716) -> (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0)
c  in CNF:
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_2
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_1
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨  b^{1, 717}_0
c  in DIMACS:
 3308  3309  3310 -716 -3311 0
 3308  3309  3310 -716 -3312 0
 3308  3309  3310 -716  3313 0

c  1+1 --> 2
c    (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0 ∧  p_716) -> (-b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0)
c  in CNF:
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_2
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨  b^{1, 717}_1
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ -p_716 ∨ -b^{1, 717}_0
c  in DIMACS:
 3308  3309 -3310 -716 -3311 0
 3308  3309 -3310 -716  3312 0
 3308  3309 -3310 -716 -3313 0

c  2+1 --> break 
c    (-b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧  p_716) -> break
c  in CNF:
c     b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ -p_716 ∨ break
c  in DIMACS:
 3308 -3309  3310 -716 1162 0


c  2-1 --> 1
c    (-b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧ -p_716) -> (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0)
c  in CNF:
c     b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_2
c     b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_1
c     b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨  b^{1, 717}_0
c  in DIMACS:
 3308 -3309  3310  716 -3311 0
 3308 -3309  3310  716 -3312 0
 3308 -3309  3310  716  3313 0

c  1-1 --> 0
c    (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0 ∧ -p_716) -> (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧ -b^{1, 717}_0)
c  in CNF:
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_2
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_1
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_0
c  in DIMACS:
 3308  3309 -3310  716 -3311 0
 3308  3309 -3310  716 -3312 0
 3308  3309 -3310  716 -3313 0

c  0-1 --> -1
c    (-b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧ -p_716) -> ( b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0)
c  in CNF:
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨  b^{1, 717}_2
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_1
c     b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨  b^{1, 717}_0
c  in DIMACS:
 3308  3309  3310  716  3311 0
 3308  3309  3310  716 -3312 0
 3308  3309  3310  716  3313 0

c  -1-1 --> -2
c    ( b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧  b^{1, 716}_0 ∧ -p_716) -> ( b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0)
c  in CNF:
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨  b^{1, 717}_2
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨  b^{1, 717}_1
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨  p_716 ∨ -b^{1, 717}_0
c  in DIMACS:
-3308  3309 -3310  716  3311 0
-3308  3309 -3310  716  3312 0
-3308  3309 -3310  716 -3313 0

c  -2-1 --> break 
c    ( b^{1, 716}_2 ∧  b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧ -p_716) -> break
c  in CNF:
c    -b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨  b^{1, 716}_0 ∨  p_716 ∨ break
c  in DIMACS:
-3308 -3309  3310  716 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 716}_2 ∧ -b^{1, 716}_1 ∧ -b^{1, 716}_0 ∧ true) 
c  in CNF:
c    -b^{1, 716}_2 ∨  b^{1, 716}_1 ∨  b^{1, 716}_0 ∨ false 
c  in DIMACS:
-3308  3309  3310  0

c  3 does not represent an automaton state.
c    -(-b^{1, 716}_2 ∧  b^{1, 716}_1 ∧  b^{1, 716}_0 ∧ true) 
c  in CNF:
c     b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ false 
c  in DIMACS:
 3308 -3309 -3310  0
c  -3 does not represent an automaton state.
c    -( b^{1, 716}_2 ∧  b^{1, 716}_1 ∧  b^{1, 716}_0 ∧ true) 
c  in CNF:
c    -b^{1, 716}_2 ∨ -b^{1, 716}_1 ∨ -b^{1, 716}_0 ∨ false 
c  in DIMACS:
-3308 -3309 -3310  0

c i = 717
c  -2+1 --> -1
c    ( b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧  p_717) -> ( b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0)
c  in CNF:
c    -b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨  b^{1, 718}_2
c    -b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_1
c    -b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨  b^{1, 718}_0
c  in DIMACS:
-3311 -3312  3313 -717  3314 0
-3311 -3312  3313 -717 -3315 0
-3311 -3312  3313 -717  3316 0

c  -1+1 --> 0
c    ( b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0 ∧  p_717) -> (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧ -b^{1, 718}_0)
c  in CNF:
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_2
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_1
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_0
c  in DIMACS:
-3311  3312 -3313 -717 -3314 0
-3311  3312 -3313 -717 -3315 0
-3311  3312 -3313 -717 -3316 0

c  0+1 --> 1
c    (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧  p_717) -> (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0)
c  in CNF:
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_2
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_1
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨  b^{1, 718}_0
c  in DIMACS:
 3311  3312  3313 -717 -3314 0
 3311  3312  3313 -717 -3315 0
 3311  3312  3313 -717  3316 0

c  1+1 --> 2
c    (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0 ∧  p_717) -> (-b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0)
c  in CNF:
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_2
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨  b^{1, 718}_1
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ -p_717 ∨ -b^{1, 718}_0
c  in DIMACS:
 3311  3312 -3313 -717 -3314 0
 3311  3312 -3313 -717  3315 0
 3311  3312 -3313 -717 -3316 0

c  2+1 --> break 
c    (-b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧  p_717) -> break
c  in CNF:
c     b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ -p_717 ∨ break
c  in DIMACS:
 3311 -3312  3313 -717 1162 0


c  2-1 --> 1
c    (-b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧ -p_717) -> (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0)
c  in CNF:
c     b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_2
c     b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_1
c     b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨  b^{1, 718}_0
c  in DIMACS:
 3311 -3312  3313  717 -3314 0
 3311 -3312  3313  717 -3315 0
 3311 -3312  3313  717  3316 0

c  1-1 --> 0
c    (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0 ∧ -p_717) -> (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧ -b^{1, 718}_0)
c  in CNF:
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_2
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_1
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_0
c  in DIMACS:
 3311  3312 -3313  717 -3314 0
 3311  3312 -3313  717 -3315 0
 3311  3312 -3313  717 -3316 0

c  0-1 --> -1
c    (-b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧ -p_717) -> ( b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0)
c  in CNF:
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨  b^{1, 718}_2
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_1
c     b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨  b^{1, 718}_0
c  in DIMACS:
 3311  3312  3313  717  3314 0
 3311  3312  3313  717 -3315 0
 3311  3312  3313  717  3316 0

c  -1-1 --> -2
c    ( b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧  b^{1, 717}_0 ∧ -p_717) -> ( b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0)
c  in CNF:
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨  b^{1, 718}_2
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨  b^{1, 718}_1
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨  p_717 ∨ -b^{1, 718}_0
c  in DIMACS:
-3311  3312 -3313  717  3314 0
-3311  3312 -3313  717  3315 0
-3311  3312 -3313  717 -3316 0

c  -2-1 --> break 
c    ( b^{1, 717}_2 ∧  b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧ -p_717) -> break
c  in CNF:
c    -b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨  b^{1, 717}_0 ∨  p_717 ∨ break
c  in DIMACS:
-3311 -3312  3313  717 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 717}_2 ∧ -b^{1, 717}_1 ∧ -b^{1, 717}_0 ∧ true) 
c  in CNF:
c    -b^{1, 717}_2 ∨  b^{1, 717}_1 ∨  b^{1, 717}_0 ∨ false 
c  in DIMACS:
-3311  3312  3313  0

c  3 does not represent an automaton state.
c    -(-b^{1, 717}_2 ∧  b^{1, 717}_1 ∧  b^{1, 717}_0 ∧ true) 
c  in CNF:
c     b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ false 
c  in DIMACS:
 3311 -3312 -3313  0
c  -3 does not represent an automaton state.
c    -( b^{1, 717}_2 ∧  b^{1, 717}_1 ∧  b^{1, 717}_0 ∧ true) 
c  in CNF:
c    -b^{1, 717}_2 ∨ -b^{1, 717}_1 ∨ -b^{1, 717}_0 ∨ false 
c  in DIMACS:
-3311 -3312 -3313  0

c i = 718
c  -2+1 --> -1
c    ( b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧  p_718) -> ( b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0)
c  in CNF:
c    -b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨  b^{1, 719}_2
c    -b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_1
c    -b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨  b^{1, 719}_0
c  in DIMACS:
-3314 -3315  3316 -718  3317 0
-3314 -3315  3316 -718 -3318 0
-3314 -3315  3316 -718  3319 0

c  -1+1 --> 0
c    ( b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0 ∧  p_718) -> (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧ -b^{1, 719}_0)
c  in CNF:
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_2
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_1
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_0
c  in DIMACS:
-3314  3315 -3316 -718 -3317 0
-3314  3315 -3316 -718 -3318 0
-3314  3315 -3316 -718 -3319 0

c  0+1 --> 1
c    (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧  p_718) -> (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0)
c  in CNF:
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_2
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_1
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨  b^{1, 719}_0
c  in DIMACS:
 3314  3315  3316 -718 -3317 0
 3314  3315  3316 -718 -3318 0
 3314  3315  3316 -718  3319 0

c  1+1 --> 2
c    (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0 ∧  p_718) -> (-b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0)
c  in CNF:
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_2
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨  b^{1, 719}_1
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ -p_718 ∨ -b^{1, 719}_0
c  in DIMACS:
 3314  3315 -3316 -718 -3317 0
 3314  3315 -3316 -718  3318 0
 3314  3315 -3316 -718 -3319 0

c  2+1 --> break 
c    (-b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧  p_718) -> break
c  in CNF:
c     b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ -p_718 ∨ break
c  in DIMACS:
 3314 -3315  3316 -718 1162 0


c  2-1 --> 1
c    (-b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧ -p_718) -> (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0)
c  in CNF:
c     b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_2
c     b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_1
c     b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨  b^{1, 719}_0
c  in DIMACS:
 3314 -3315  3316  718 -3317 0
 3314 -3315  3316  718 -3318 0
 3314 -3315  3316  718  3319 0

c  1-1 --> 0
c    (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0 ∧ -p_718) -> (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧ -b^{1, 719}_0)
c  in CNF:
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_2
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_1
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_0
c  in DIMACS:
 3314  3315 -3316  718 -3317 0
 3314  3315 -3316  718 -3318 0
 3314  3315 -3316  718 -3319 0

c  0-1 --> -1
c    (-b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧ -p_718) -> ( b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0)
c  in CNF:
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨  b^{1, 719}_2
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_1
c     b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨  b^{1, 719}_0
c  in DIMACS:
 3314  3315  3316  718  3317 0
 3314  3315  3316  718 -3318 0
 3314  3315  3316  718  3319 0

c  -1-1 --> -2
c    ( b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧  b^{1, 718}_0 ∧ -p_718) -> ( b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0)
c  in CNF:
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨  b^{1, 719}_2
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨  b^{1, 719}_1
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨  p_718 ∨ -b^{1, 719}_0
c  in DIMACS:
-3314  3315 -3316  718  3317 0
-3314  3315 -3316  718  3318 0
-3314  3315 -3316  718 -3319 0

c  -2-1 --> break 
c    ( b^{1, 718}_2 ∧  b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧ -p_718) -> break
c  in CNF:
c    -b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨  b^{1, 718}_0 ∨  p_718 ∨ break
c  in DIMACS:
-3314 -3315  3316  718 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 718}_2 ∧ -b^{1, 718}_1 ∧ -b^{1, 718}_0 ∧ true) 
c  in CNF:
c    -b^{1, 718}_2 ∨  b^{1, 718}_1 ∨  b^{1, 718}_0 ∨ false 
c  in DIMACS:
-3314  3315  3316  0

c  3 does not represent an automaton state.
c    -(-b^{1, 718}_2 ∧  b^{1, 718}_1 ∧  b^{1, 718}_0 ∧ true) 
c  in CNF:
c     b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ false 
c  in DIMACS:
 3314 -3315 -3316  0
c  -3 does not represent an automaton state.
c    -( b^{1, 718}_2 ∧  b^{1, 718}_1 ∧  b^{1, 718}_0 ∧ true) 
c  in CNF:
c    -b^{1, 718}_2 ∨ -b^{1, 718}_1 ∨ -b^{1, 718}_0 ∨ false 
c  in DIMACS:
-3314 -3315 -3316  0

c i = 719
c  -2+1 --> -1
c    ( b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧  p_719) -> ( b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0)
c  in CNF:
c    -b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨  b^{1, 720}_2
c    -b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_1
c    -b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨  b^{1, 720}_0
c  in DIMACS:
-3317 -3318  3319 -719  3320 0
-3317 -3318  3319 -719 -3321 0
-3317 -3318  3319 -719  3322 0

c  -1+1 --> 0
c    ( b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0 ∧  p_719) -> (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧ -b^{1, 720}_0)
c  in CNF:
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_2
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_1
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_0
c  in DIMACS:
-3317  3318 -3319 -719 -3320 0
-3317  3318 -3319 -719 -3321 0
-3317  3318 -3319 -719 -3322 0

c  0+1 --> 1
c    (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧  p_719) -> (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0)
c  in CNF:
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_2
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_1
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨  b^{1, 720}_0
c  in DIMACS:
 3317  3318  3319 -719 -3320 0
 3317  3318  3319 -719 -3321 0
 3317  3318  3319 -719  3322 0

c  1+1 --> 2
c    (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0 ∧  p_719) -> (-b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0)
c  in CNF:
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_2
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨  b^{1, 720}_1
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ -p_719 ∨ -b^{1, 720}_0
c  in DIMACS:
 3317  3318 -3319 -719 -3320 0
 3317  3318 -3319 -719  3321 0
 3317  3318 -3319 -719 -3322 0

c  2+1 --> break 
c    (-b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧  p_719) -> break
c  in CNF:
c     b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ -p_719 ∨ break
c  in DIMACS:
 3317 -3318  3319 -719 1162 0


c  2-1 --> 1
c    (-b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧ -p_719) -> (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0)
c  in CNF:
c     b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_2
c     b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_1
c     b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨  b^{1, 720}_0
c  in DIMACS:
 3317 -3318  3319  719 -3320 0
 3317 -3318  3319  719 -3321 0
 3317 -3318  3319  719  3322 0

c  1-1 --> 0
c    (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0 ∧ -p_719) -> (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧ -b^{1, 720}_0)
c  in CNF:
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_2
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_1
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_0
c  in DIMACS:
 3317  3318 -3319  719 -3320 0
 3317  3318 -3319  719 -3321 0
 3317  3318 -3319  719 -3322 0

c  0-1 --> -1
c    (-b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧ -p_719) -> ( b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0)
c  in CNF:
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨  b^{1, 720}_2
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_1
c     b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨  b^{1, 720}_0
c  in DIMACS:
 3317  3318  3319  719  3320 0
 3317  3318  3319  719 -3321 0
 3317  3318  3319  719  3322 0

c  -1-1 --> -2
c    ( b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧  b^{1, 719}_0 ∧ -p_719) -> ( b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0)
c  in CNF:
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨  b^{1, 720}_2
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨  b^{1, 720}_1
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨  p_719 ∨ -b^{1, 720}_0
c  in DIMACS:
-3317  3318 -3319  719  3320 0
-3317  3318 -3319  719  3321 0
-3317  3318 -3319  719 -3322 0

c  -2-1 --> break 
c    ( b^{1, 719}_2 ∧  b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧ -p_719) -> break
c  in CNF:
c    -b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨  b^{1, 719}_0 ∨  p_719 ∨ break
c  in DIMACS:
-3317 -3318  3319  719 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 719}_2 ∧ -b^{1, 719}_1 ∧ -b^{1, 719}_0 ∧ true) 
c  in CNF:
c    -b^{1, 719}_2 ∨  b^{1, 719}_1 ∨  b^{1, 719}_0 ∨ false 
c  in DIMACS:
-3317  3318  3319  0

c  3 does not represent an automaton state.
c    -(-b^{1, 719}_2 ∧  b^{1, 719}_1 ∧  b^{1, 719}_0 ∧ true) 
c  in CNF:
c     b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ false 
c  in DIMACS:
 3317 -3318 -3319  0
c  -3 does not represent an automaton state.
c    -( b^{1, 719}_2 ∧  b^{1, 719}_1 ∧  b^{1, 719}_0 ∧ true) 
c  in CNF:
c    -b^{1, 719}_2 ∨ -b^{1, 719}_1 ∨ -b^{1, 719}_0 ∨ false 
c  in DIMACS:
-3317 -3318 -3319  0

c i = 720
c  -2+1 --> -1
c    ( b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧  p_720) -> ( b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0)
c  in CNF:
c    -b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨  b^{1, 721}_2
c    -b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_1
c    -b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨  b^{1, 721}_0
c  in DIMACS:
-3320 -3321  3322 -720  3323 0
-3320 -3321  3322 -720 -3324 0
-3320 -3321  3322 -720  3325 0

c  -1+1 --> 0
c    ( b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0 ∧  p_720) -> (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧ -b^{1, 721}_0)
c  in CNF:
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_2
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_1
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_0
c  in DIMACS:
-3320  3321 -3322 -720 -3323 0
-3320  3321 -3322 -720 -3324 0
-3320  3321 -3322 -720 -3325 0

c  0+1 --> 1
c    (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧  p_720) -> (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0)
c  in CNF:
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_2
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_1
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨  b^{1, 721}_0
c  in DIMACS:
 3320  3321  3322 -720 -3323 0
 3320  3321  3322 -720 -3324 0
 3320  3321  3322 -720  3325 0

c  1+1 --> 2
c    (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0 ∧  p_720) -> (-b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0)
c  in CNF:
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_2
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨  b^{1, 721}_1
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ -p_720 ∨ -b^{1, 721}_0
c  in DIMACS:
 3320  3321 -3322 -720 -3323 0
 3320  3321 -3322 -720  3324 0
 3320  3321 -3322 -720 -3325 0

c  2+1 --> break 
c    (-b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧  p_720) -> break
c  in CNF:
c     b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 3320 -3321  3322 -720 1162 0


c  2-1 --> 1
c    (-b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧ -p_720) -> (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0)
c  in CNF:
c     b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_2
c     b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_1
c     b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨  b^{1, 721}_0
c  in DIMACS:
 3320 -3321  3322  720 -3323 0
 3320 -3321  3322  720 -3324 0
 3320 -3321  3322  720  3325 0

c  1-1 --> 0
c    (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0 ∧ -p_720) -> (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧ -b^{1, 721}_0)
c  in CNF:
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_2
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_1
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_0
c  in DIMACS:
 3320  3321 -3322  720 -3323 0
 3320  3321 -3322  720 -3324 0
 3320  3321 -3322  720 -3325 0

c  0-1 --> -1
c    (-b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧ -p_720) -> ( b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0)
c  in CNF:
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨  b^{1, 721}_2
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_1
c     b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨  b^{1, 721}_0
c  in DIMACS:
 3320  3321  3322  720  3323 0
 3320  3321  3322  720 -3324 0
 3320  3321  3322  720  3325 0

c  -1-1 --> -2
c    ( b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧  b^{1, 720}_0 ∧ -p_720) -> ( b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0)
c  in CNF:
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨  b^{1, 721}_2
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨  b^{1, 721}_1
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨  p_720 ∨ -b^{1, 721}_0
c  in DIMACS:
-3320  3321 -3322  720  3323 0
-3320  3321 -3322  720  3324 0
-3320  3321 -3322  720 -3325 0

c  -2-1 --> break 
c    ( b^{1, 720}_2 ∧  b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨  b^{1, 720}_0 ∨  p_720 ∨ break
c  in DIMACS:
-3320 -3321  3322  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 720}_2 ∧ -b^{1, 720}_1 ∧ -b^{1, 720}_0 ∧ true) 
c  in CNF:
c    -b^{1, 720}_2 ∨  b^{1, 720}_1 ∨  b^{1, 720}_0 ∨ false 
c  in DIMACS:
-3320  3321  3322  0

c  3 does not represent an automaton state.
c    -(-b^{1, 720}_2 ∧  b^{1, 720}_1 ∧  b^{1, 720}_0 ∧ true) 
c  in CNF:
c     b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ false 
c  in DIMACS:
 3320 -3321 -3322  0
c  -3 does not represent an automaton state.
c    -( b^{1, 720}_2 ∧  b^{1, 720}_1 ∧  b^{1, 720}_0 ∧ true) 
c  in CNF:
c    -b^{1, 720}_2 ∨ -b^{1, 720}_1 ∨ -b^{1, 720}_0 ∨ false 
c  in DIMACS:
-3320 -3321 -3322  0

c i = 721
c  -2+1 --> -1
c    ( b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧  p_721) -> ( b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0)
c  in CNF:
c    -b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨  b^{1, 722}_2
c    -b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_1
c    -b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨  b^{1, 722}_0
c  in DIMACS:
-3323 -3324  3325 -721  3326 0
-3323 -3324  3325 -721 -3327 0
-3323 -3324  3325 -721  3328 0

c  -1+1 --> 0
c    ( b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0 ∧  p_721) -> (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧ -b^{1, 722}_0)
c  in CNF:
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_2
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_1
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_0
c  in DIMACS:
-3323  3324 -3325 -721 -3326 0
-3323  3324 -3325 -721 -3327 0
-3323  3324 -3325 -721 -3328 0

c  0+1 --> 1
c    (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧  p_721) -> (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0)
c  in CNF:
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_2
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_1
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨  b^{1, 722}_0
c  in DIMACS:
 3323  3324  3325 -721 -3326 0
 3323  3324  3325 -721 -3327 0
 3323  3324  3325 -721  3328 0

c  1+1 --> 2
c    (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0 ∧  p_721) -> (-b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0)
c  in CNF:
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_2
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨  b^{1, 722}_1
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ -p_721 ∨ -b^{1, 722}_0
c  in DIMACS:
 3323  3324 -3325 -721 -3326 0
 3323  3324 -3325 -721  3327 0
 3323  3324 -3325 -721 -3328 0

c  2+1 --> break 
c    (-b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧  p_721) -> break
c  in CNF:
c     b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ -p_721 ∨ break
c  in DIMACS:
 3323 -3324  3325 -721 1162 0


c  2-1 --> 1
c    (-b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧ -p_721) -> (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0)
c  in CNF:
c     b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_2
c     b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_1
c     b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨  b^{1, 722}_0
c  in DIMACS:
 3323 -3324  3325  721 -3326 0
 3323 -3324  3325  721 -3327 0
 3323 -3324  3325  721  3328 0

c  1-1 --> 0
c    (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0 ∧ -p_721) -> (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧ -b^{1, 722}_0)
c  in CNF:
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_2
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_1
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_0
c  in DIMACS:
 3323  3324 -3325  721 -3326 0
 3323  3324 -3325  721 -3327 0
 3323  3324 -3325  721 -3328 0

c  0-1 --> -1
c    (-b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧ -p_721) -> ( b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0)
c  in CNF:
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨  b^{1, 722}_2
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_1
c     b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨  b^{1, 722}_0
c  in DIMACS:
 3323  3324  3325  721  3326 0
 3323  3324  3325  721 -3327 0
 3323  3324  3325  721  3328 0

c  -1-1 --> -2
c    ( b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧  b^{1, 721}_0 ∧ -p_721) -> ( b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0)
c  in CNF:
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨  b^{1, 722}_2
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨  b^{1, 722}_1
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨  p_721 ∨ -b^{1, 722}_0
c  in DIMACS:
-3323  3324 -3325  721  3326 0
-3323  3324 -3325  721  3327 0
-3323  3324 -3325  721 -3328 0

c  -2-1 --> break 
c    ( b^{1, 721}_2 ∧  b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧ -p_721) -> break
c  in CNF:
c    -b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨  b^{1, 721}_0 ∨  p_721 ∨ break
c  in DIMACS:
-3323 -3324  3325  721 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 721}_2 ∧ -b^{1, 721}_1 ∧ -b^{1, 721}_0 ∧ true) 
c  in CNF:
c    -b^{1, 721}_2 ∨  b^{1, 721}_1 ∨  b^{1, 721}_0 ∨ false 
c  in DIMACS:
-3323  3324  3325  0

c  3 does not represent an automaton state.
c    -(-b^{1, 721}_2 ∧  b^{1, 721}_1 ∧  b^{1, 721}_0 ∧ true) 
c  in CNF:
c     b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ false 
c  in DIMACS:
 3323 -3324 -3325  0
c  -3 does not represent an automaton state.
c    -( b^{1, 721}_2 ∧  b^{1, 721}_1 ∧  b^{1, 721}_0 ∧ true) 
c  in CNF:
c    -b^{1, 721}_2 ∨ -b^{1, 721}_1 ∨ -b^{1, 721}_0 ∨ false 
c  in DIMACS:
-3323 -3324 -3325  0

c i = 722
c  -2+1 --> -1
c    ( b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧  p_722) -> ( b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0)
c  in CNF:
c    -b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨  b^{1, 723}_2
c    -b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_1
c    -b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨  b^{1, 723}_0
c  in DIMACS:
-3326 -3327  3328 -722  3329 0
-3326 -3327  3328 -722 -3330 0
-3326 -3327  3328 -722  3331 0

c  -1+1 --> 0
c    ( b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0 ∧  p_722) -> (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧ -b^{1, 723}_0)
c  in CNF:
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_2
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_1
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_0
c  in DIMACS:
-3326  3327 -3328 -722 -3329 0
-3326  3327 -3328 -722 -3330 0
-3326  3327 -3328 -722 -3331 0

c  0+1 --> 1
c    (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧  p_722) -> (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0)
c  in CNF:
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_2
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_1
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨  b^{1, 723}_0
c  in DIMACS:
 3326  3327  3328 -722 -3329 0
 3326  3327  3328 -722 -3330 0
 3326  3327  3328 -722  3331 0

c  1+1 --> 2
c    (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0 ∧  p_722) -> (-b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0)
c  in CNF:
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_2
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨  b^{1, 723}_1
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ -p_722 ∨ -b^{1, 723}_0
c  in DIMACS:
 3326  3327 -3328 -722 -3329 0
 3326  3327 -3328 -722  3330 0
 3326  3327 -3328 -722 -3331 0

c  2+1 --> break 
c    (-b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧  p_722) -> break
c  in CNF:
c     b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ -p_722 ∨ break
c  in DIMACS:
 3326 -3327  3328 -722 1162 0


c  2-1 --> 1
c    (-b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧ -p_722) -> (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0)
c  in CNF:
c     b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_2
c     b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_1
c     b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨  b^{1, 723}_0
c  in DIMACS:
 3326 -3327  3328  722 -3329 0
 3326 -3327  3328  722 -3330 0
 3326 -3327  3328  722  3331 0

c  1-1 --> 0
c    (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0 ∧ -p_722) -> (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧ -b^{1, 723}_0)
c  in CNF:
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_2
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_1
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_0
c  in DIMACS:
 3326  3327 -3328  722 -3329 0
 3326  3327 -3328  722 -3330 0
 3326  3327 -3328  722 -3331 0

c  0-1 --> -1
c    (-b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧ -p_722) -> ( b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0)
c  in CNF:
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨  b^{1, 723}_2
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_1
c     b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨  b^{1, 723}_0
c  in DIMACS:
 3326  3327  3328  722  3329 0
 3326  3327  3328  722 -3330 0
 3326  3327  3328  722  3331 0

c  -1-1 --> -2
c    ( b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧  b^{1, 722}_0 ∧ -p_722) -> ( b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0)
c  in CNF:
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨  b^{1, 723}_2
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨  b^{1, 723}_1
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨  p_722 ∨ -b^{1, 723}_0
c  in DIMACS:
-3326  3327 -3328  722  3329 0
-3326  3327 -3328  722  3330 0
-3326  3327 -3328  722 -3331 0

c  -2-1 --> break 
c    ( b^{1, 722}_2 ∧  b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧ -p_722) -> break
c  in CNF:
c    -b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨  b^{1, 722}_0 ∨  p_722 ∨ break
c  in DIMACS:
-3326 -3327  3328  722 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 722}_2 ∧ -b^{1, 722}_1 ∧ -b^{1, 722}_0 ∧ true) 
c  in CNF:
c    -b^{1, 722}_2 ∨  b^{1, 722}_1 ∨  b^{1, 722}_0 ∨ false 
c  in DIMACS:
-3326  3327  3328  0

c  3 does not represent an automaton state.
c    -(-b^{1, 722}_2 ∧  b^{1, 722}_1 ∧  b^{1, 722}_0 ∧ true) 
c  in CNF:
c     b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ false 
c  in DIMACS:
 3326 -3327 -3328  0
c  -3 does not represent an automaton state.
c    -( b^{1, 722}_2 ∧  b^{1, 722}_1 ∧  b^{1, 722}_0 ∧ true) 
c  in CNF:
c    -b^{1, 722}_2 ∨ -b^{1, 722}_1 ∨ -b^{1, 722}_0 ∨ false 
c  in DIMACS:
-3326 -3327 -3328  0

c i = 723
c  -2+1 --> -1
c    ( b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧  p_723) -> ( b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0)
c  in CNF:
c    -b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨  b^{1, 724}_2
c    -b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_1
c    -b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨  b^{1, 724}_0
c  in DIMACS:
-3329 -3330  3331 -723  3332 0
-3329 -3330  3331 -723 -3333 0
-3329 -3330  3331 -723  3334 0

c  -1+1 --> 0
c    ( b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0 ∧  p_723) -> (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧ -b^{1, 724}_0)
c  in CNF:
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_2
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_1
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_0
c  in DIMACS:
-3329  3330 -3331 -723 -3332 0
-3329  3330 -3331 -723 -3333 0
-3329  3330 -3331 -723 -3334 0

c  0+1 --> 1
c    (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧  p_723) -> (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0)
c  in CNF:
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_2
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_1
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨  b^{1, 724}_0
c  in DIMACS:
 3329  3330  3331 -723 -3332 0
 3329  3330  3331 -723 -3333 0
 3329  3330  3331 -723  3334 0

c  1+1 --> 2
c    (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0 ∧  p_723) -> (-b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0)
c  in CNF:
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_2
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨  b^{1, 724}_1
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ -p_723 ∨ -b^{1, 724}_0
c  in DIMACS:
 3329  3330 -3331 -723 -3332 0
 3329  3330 -3331 -723  3333 0
 3329  3330 -3331 -723 -3334 0

c  2+1 --> break 
c    (-b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧  p_723) -> break
c  in CNF:
c     b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ -p_723 ∨ break
c  in DIMACS:
 3329 -3330  3331 -723 1162 0


c  2-1 --> 1
c    (-b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧ -p_723) -> (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0)
c  in CNF:
c     b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_2
c     b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_1
c     b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨  b^{1, 724}_0
c  in DIMACS:
 3329 -3330  3331  723 -3332 0
 3329 -3330  3331  723 -3333 0
 3329 -3330  3331  723  3334 0

c  1-1 --> 0
c    (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0 ∧ -p_723) -> (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧ -b^{1, 724}_0)
c  in CNF:
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_2
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_1
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_0
c  in DIMACS:
 3329  3330 -3331  723 -3332 0
 3329  3330 -3331  723 -3333 0
 3329  3330 -3331  723 -3334 0

c  0-1 --> -1
c    (-b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧ -p_723) -> ( b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0)
c  in CNF:
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨  b^{1, 724}_2
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_1
c     b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨  b^{1, 724}_0
c  in DIMACS:
 3329  3330  3331  723  3332 0
 3329  3330  3331  723 -3333 0
 3329  3330  3331  723  3334 0

c  -1-1 --> -2
c    ( b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧  b^{1, 723}_0 ∧ -p_723) -> ( b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0)
c  in CNF:
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨  b^{1, 724}_2
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨  b^{1, 724}_1
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨  p_723 ∨ -b^{1, 724}_0
c  in DIMACS:
-3329  3330 -3331  723  3332 0
-3329  3330 -3331  723  3333 0
-3329  3330 -3331  723 -3334 0

c  -2-1 --> break 
c    ( b^{1, 723}_2 ∧  b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧ -p_723) -> break
c  in CNF:
c    -b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨  b^{1, 723}_0 ∨  p_723 ∨ break
c  in DIMACS:
-3329 -3330  3331  723 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 723}_2 ∧ -b^{1, 723}_1 ∧ -b^{1, 723}_0 ∧ true) 
c  in CNF:
c    -b^{1, 723}_2 ∨  b^{1, 723}_1 ∨  b^{1, 723}_0 ∨ false 
c  in DIMACS:
-3329  3330  3331  0

c  3 does not represent an automaton state.
c    -(-b^{1, 723}_2 ∧  b^{1, 723}_1 ∧  b^{1, 723}_0 ∧ true) 
c  in CNF:
c     b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ false 
c  in DIMACS:
 3329 -3330 -3331  0
c  -3 does not represent an automaton state.
c    -( b^{1, 723}_2 ∧  b^{1, 723}_1 ∧  b^{1, 723}_0 ∧ true) 
c  in CNF:
c    -b^{1, 723}_2 ∨ -b^{1, 723}_1 ∨ -b^{1, 723}_0 ∨ false 
c  in DIMACS:
-3329 -3330 -3331  0

c i = 724
c  -2+1 --> -1
c    ( b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧  p_724) -> ( b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0)
c  in CNF:
c    -b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨  b^{1, 725}_2
c    -b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_1
c    -b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨  b^{1, 725}_0
c  in DIMACS:
-3332 -3333  3334 -724  3335 0
-3332 -3333  3334 -724 -3336 0
-3332 -3333  3334 -724  3337 0

c  -1+1 --> 0
c    ( b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0 ∧  p_724) -> (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧ -b^{1, 725}_0)
c  in CNF:
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_2
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_1
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_0
c  in DIMACS:
-3332  3333 -3334 -724 -3335 0
-3332  3333 -3334 -724 -3336 0
-3332  3333 -3334 -724 -3337 0

c  0+1 --> 1
c    (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧  p_724) -> (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0)
c  in CNF:
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_2
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_1
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨  b^{1, 725}_0
c  in DIMACS:
 3332  3333  3334 -724 -3335 0
 3332  3333  3334 -724 -3336 0
 3332  3333  3334 -724  3337 0

c  1+1 --> 2
c    (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0 ∧  p_724) -> (-b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0)
c  in CNF:
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_2
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨  b^{1, 725}_1
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ -p_724 ∨ -b^{1, 725}_0
c  in DIMACS:
 3332  3333 -3334 -724 -3335 0
 3332  3333 -3334 -724  3336 0
 3332  3333 -3334 -724 -3337 0

c  2+1 --> break 
c    (-b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧  p_724) -> break
c  in CNF:
c     b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ -p_724 ∨ break
c  in DIMACS:
 3332 -3333  3334 -724 1162 0


c  2-1 --> 1
c    (-b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧ -p_724) -> (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0)
c  in CNF:
c     b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_2
c     b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_1
c     b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨  b^{1, 725}_0
c  in DIMACS:
 3332 -3333  3334  724 -3335 0
 3332 -3333  3334  724 -3336 0
 3332 -3333  3334  724  3337 0

c  1-1 --> 0
c    (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0 ∧ -p_724) -> (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧ -b^{1, 725}_0)
c  in CNF:
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_2
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_1
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_0
c  in DIMACS:
 3332  3333 -3334  724 -3335 0
 3332  3333 -3334  724 -3336 0
 3332  3333 -3334  724 -3337 0

c  0-1 --> -1
c    (-b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧ -p_724) -> ( b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0)
c  in CNF:
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨  b^{1, 725}_2
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_1
c     b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨  b^{1, 725}_0
c  in DIMACS:
 3332  3333  3334  724  3335 0
 3332  3333  3334  724 -3336 0
 3332  3333  3334  724  3337 0

c  -1-1 --> -2
c    ( b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧  b^{1, 724}_0 ∧ -p_724) -> ( b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0)
c  in CNF:
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨  b^{1, 725}_2
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨  b^{1, 725}_1
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨  p_724 ∨ -b^{1, 725}_0
c  in DIMACS:
-3332  3333 -3334  724  3335 0
-3332  3333 -3334  724  3336 0
-3332  3333 -3334  724 -3337 0

c  -2-1 --> break 
c    ( b^{1, 724}_2 ∧  b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧ -p_724) -> break
c  in CNF:
c    -b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨  b^{1, 724}_0 ∨  p_724 ∨ break
c  in DIMACS:
-3332 -3333  3334  724 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 724}_2 ∧ -b^{1, 724}_1 ∧ -b^{1, 724}_0 ∧ true) 
c  in CNF:
c    -b^{1, 724}_2 ∨  b^{1, 724}_1 ∨  b^{1, 724}_0 ∨ false 
c  in DIMACS:
-3332  3333  3334  0

c  3 does not represent an automaton state.
c    -(-b^{1, 724}_2 ∧  b^{1, 724}_1 ∧  b^{1, 724}_0 ∧ true) 
c  in CNF:
c     b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ false 
c  in DIMACS:
 3332 -3333 -3334  0
c  -3 does not represent an automaton state.
c    -( b^{1, 724}_2 ∧  b^{1, 724}_1 ∧  b^{1, 724}_0 ∧ true) 
c  in CNF:
c    -b^{1, 724}_2 ∨ -b^{1, 724}_1 ∨ -b^{1, 724}_0 ∨ false 
c  in DIMACS:
-3332 -3333 -3334  0

c i = 725
c  -2+1 --> -1
c    ( b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧  p_725) -> ( b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0)
c  in CNF:
c    -b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨  b^{1, 726}_2
c    -b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_1
c    -b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨  b^{1, 726}_0
c  in DIMACS:
-3335 -3336  3337 -725  3338 0
-3335 -3336  3337 -725 -3339 0
-3335 -3336  3337 -725  3340 0

c  -1+1 --> 0
c    ( b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0 ∧  p_725) -> (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧ -b^{1, 726}_0)
c  in CNF:
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_2
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_1
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_0
c  in DIMACS:
-3335  3336 -3337 -725 -3338 0
-3335  3336 -3337 -725 -3339 0
-3335  3336 -3337 -725 -3340 0

c  0+1 --> 1
c    (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧  p_725) -> (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0)
c  in CNF:
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_2
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_1
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨  b^{1, 726}_0
c  in DIMACS:
 3335  3336  3337 -725 -3338 0
 3335  3336  3337 -725 -3339 0
 3335  3336  3337 -725  3340 0

c  1+1 --> 2
c    (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0 ∧  p_725) -> (-b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0)
c  in CNF:
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_2
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨  b^{1, 726}_1
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ -p_725 ∨ -b^{1, 726}_0
c  in DIMACS:
 3335  3336 -3337 -725 -3338 0
 3335  3336 -3337 -725  3339 0
 3335  3336 -3337 -725 -3340 0

c  2+1 --> break 
c    (-b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧  p_725) -> break
c  in CNF:
c     b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ -p_725 ∨ break
c  in DIMACS:
 3335 -3336  3337 -725 1162 0


c  2-1 --> 1
c    (-b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧ -p_725) -> (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0)
c  in CNF:
c     b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_2
c     b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_1
c     b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨  b^{1, 726}_0
c  in DIMACS:
 3335 -3336  3337  725 -3338 0
 3335 -3336  3337  725 -3339 0
 3335 -3336  3337  725  3340 0

c  1-1 --> 0
c    (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0 ∧ -p_725) -> (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧ -b^{1, 726}_0)
c  in CNF:
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_2
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_1
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_0
c  in DIMACS:
 3335  3336 -3337  725 -3338 0
 3335  3336 -3337  725 -3339 0
 3335  3336 -3337  725 -3340 0

c  0-1 --> -1
c    (-b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧ -p_725) -> ( b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0)
c  in CNF:
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨  b^{1, 726}_2
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_1
c     b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨  b^{1, 726}_0
c  in DIMACS:
 3335  3336  3337  725  3338 0
 3335  3336  3337  725 -3339 0
 3335  3336  3337  725  3340 0

c  -1-1 --> -2
c    ( b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧  b^{1, 725}_0 ∧ -p_725) -> ( b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0)
c  in CNF:
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨  b^{1, 726}_2
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨  b^{1, 726}_1
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨  p_725 ∨ -b^{1, 726}_0
c  in DIMACS:
-3335  3336 -3337  725  3338 0
-3335  3336 -3337  725  3339 0
-3335  3336 -3337  725 -3340 0

c  -2-1 --> break 
c    ( b^{1, 725}_2 ∧  b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧ -p_725) -> break
c  in CNF:
c    -b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨  b^{1, 725}_0 ∨  p_725 ∨ break
c  in DIMACS:
-3335 -3336  3337  725 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 725}_2 ∧ -b^{1, 725}_1 ∧ -b^{1, 725}_0 ∧ true) 
c  in CNF:
c    -b^{1, 725}_2 ∨  b^{1, 725}_1 ∨  b^{1, 725}_0 ∨ false 
c  in DIMACS:
-3335  3336  3337  0

c  3 does not represent an automaton state.
c    -(-b^{1, 725}_2 ∧  b^{1, 725}_1 ∧  b^{1, 725}_0 ∧ true) 
c  in CNF:
c     b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ false 
c  in DIMACS:
 3335 -3336 -3337  0
c  -3 does not represent an automaton state.
c    -( b^{1, 725}_2 ∧  b^{1, 725}_1 ∧  b^{1, 725}_0 ∧ true) 
c  in CNF:
c    -b^{1, 725}_2 ∨ -b^{1, 725}_1 ∨ -b^{1, 725}_0 ∨ false 
c  in DIMACS:
-3335 -3336 -3337  0

c i = 726
c  -2+1 --> -1
c    ( b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧  p_726) -> ( b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0)
c  in CNF:
c    -b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨  b^{1, 727}_2
c    -b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_1
c    -b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨  b^{1, 727}_0
c  in DIMACS:
-3338 -3339  3340 -726  3341 0
-3338 -3339  3340 -726 -3342 0
-3338 -3339  3340 -726  3343 0

c  -1+1 --> 0
c    ( b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0 ∧  p_726) -> (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧ -b^{1, 727}_0)
c  in CNF:
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_2
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_1
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_0
c  in DIMACS:
-3338  3339 -3340 -726 -3341 0
-3338  3339 -3340 -726 -3342 0
-3338  3339 -3340 -726 -3343 0

c  0+1 --> 1
c    (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧  p_726) -> (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0)
c  in CNF:
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_2
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_1
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨  b^{1, 727}_0
c  in DIMACS:
 3338  3339  3340 -726 -3341 0
 3338  3339  3340 -726 -3342 0
 3338  3339  3340 -726  3343 0

c  1+1 --> 2
c    (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0 ∧  p_726) -> (-b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0)
c  in CNF:
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_2
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨  b^{1, 727}_1
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ -p_726 ∨ -b^{1, 727}_0
c  in DIMACS:
 3338  3339 -3340 -726 -3341 0
 3338  3339 -3340 -726  3342 0
 3338  3339 -3340 -726 -3343 0

c  2+1 --> break 
c    (-b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧  p_726) -> break
c  in CNF:
c     b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 3338 -3339  3340 -726 1162 0


c  2-1 --> 1
c    (-b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧ -p_726) -> (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0)
c  in CNF:
c     b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_2
c     b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_1
c     b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨  b^{1, 727}_0
c  in DIMACS:
 3338 -3339  3340  726 -3341 0
 3338 -3339  3340  726 -3342 0
 3338 -3339  3340  726  3343 0

c  1-1 --> 0
c    (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0 ∧ -p_726) -> (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧ -b^{1, 727}_0)
c  in CNF:
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_2
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_1
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_0
c  in DIMACS:
 3338  3339 -3340  726 -3341 0
 3338  3339 -3340  726 -3342 0
 3338  3339 -3340  726 -3343 0

c  0-1 --> -1
c    (-b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧ -p_726) -> ( b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0)
c  in CNF:
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨  b^{1, 727}_2
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_1
c     b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨  b^{1, 727}_0
c  in DIMACS:
 3338  3339  3340  726  3341 0
 3338  3339  3340  726 -3342 0
 3338  3339  3340  726  3343 0

c  -1-1 --> -2
c    ( b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧  b^{1, 726}_0 ∧ -p_726) -> ( b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0)
c  in CNF:
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨  b^{1, 727}_2
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨  b^{1, 727}_1
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨  p_726 ∨ -b^{1, 727}_0
c  in DIMACS:
-3338  3339 -3340  726  3341 0
-3338  3339 -3340  726  3342 0
-3338  3339 -3340  726 -3343 0

c  -2-1 --> break 
c    ( b^{1, 726}_2 ∧  b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨  b^{1, 726}_0 ∨  p_726 ∨ break
c  in DIMACS:
-3338 -3339  3340  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 726}_2 ∧ -b^{1, 726}_1 ∧ -b^{1, 726}_0 ∧ true) 
c  in CNF:
c    -b^{1, 726}_2 ∨  b^{1, 726}_1 ∨  b^{1, 726}_0 ∨ false 
c  in DIMACS:
-3338  3339  3340  0

c  3 does not represent an automaton state.
c    -(-b^{1, 726}_2 ∧  b^{1, 726}_1 ∧  b^{1, 726}_0 ∧ true) 
c  in CNF:
c     b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ false 
c  in DIMACS:
 3338 -3339 -3340  0
c  -3 does not represent an automaton state.
c    -( b^{1, 726}_2 ∧  b^{1, 726}_1 ∧  b^{1, 726}_0 ∧ true) 
c  in CNF:
c    -b^{1, 726}_2 ∨ -b^{1, 726}_1 ∨ -b^{1, 726}_0 ∨ false 
c  in DIMACS:
-3338 -3339 -3340  0

c i = 727
c  -2+1 --> -1
c    ( b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧  p_727) -> ( b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0)
c  in CNF:
c    -b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨  b^{1, 728}_2
c    -b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_1
c    -b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨  b^{1, 728}_0
c  in DIMACS:
-3341 -3342  3343 -727  3344 0
-3341 -3342  3343 -727 -3345 0
-3341 -3342  3343 -727  3346 0

c  -1+1 --> 0
c    ( b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0 ∧  p_727) -> (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧ -b^{1, 728}_0)
c  in CNF:
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_2
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_1
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_0
c  in DIMACS:
-3341  3342 -3343 -727 -3344 0
-3341  3342 -3343 -727 -3345 0
-3341  3342 -3343 -727 -3346 0

c  0+1 --> 1
c    (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧  p_727) -> (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0)
c  in CNF:
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_2
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_1
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨  b^{1, 728}_0
c  in DIMACS:
 3341  3342  3343 -727 -3344 0
 3341  3342  3343 -727 -3345 0
 3341  3342  3343 -727  3346 0

c  1+1 --> 2
c    (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0 ∧  p_727) -> (-b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0)
c  in CNF:
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_2
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨  b^{1, 728}_1
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ -p_727 ∨ -b^{1, 728}_0
c  in DIMACS:
 3341  3342 -3343 -727 -3344 0
 3341  3342 -3343 -727  3345 0
 3341  3342 -3343 -727 -3346 0

c  2+1 --> break 
c    (-b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧  p_727) -> break
c  in CNF:
c     b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ -p_727 ∨ break
c  in DIMACS:
 3341 -3342  3343 -727 1162 0


c  2-1 --> 1
c    (-b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧ -p_727) -> (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0)
c  in CNF:
c     b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_2
c     b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_1
c     b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨  b^{1, 728}_0
c  in DIMACS:
 3341 -3342  3343  727 -3344 0
 3341 -3342  3343  727 -3345 0
 3341 -3342  3343  727  3346 0

c  1-1 --> 0
c    (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0 ∧ -p_727) -> (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧ -b^{1, 728}_0)
c  in CNF:
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_2
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_1
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_0
c  in DIMACS:
 3341  3342 -3343  727 -3344 0
 3341  3342 -3343  727 -3345 0
 3341  3342 -3343  727 -3346 0

c  0-1 --> -1
c    (-b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧ -p_727) -> ( b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0)
c  in CNF:
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨  b^{1, 728}_2
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_1
c     b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨  b^{1, 728}_0
c  in DIMACS:
 3341  3342  3343  727  3344 0
 3341  3342  3343  727 -3345 0
 3341  3342  3343  727  3346 0

c  -1-1 --> -2
c    ( b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧  b^{1, 727}_0 ∧ -p_727) -> ( b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0)
c  in CNF:
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨  b^{1, 728}_2
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨  b^{1, 728}_1
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨  p_727 ∨ -b^{1, 728}_0
c  in DIMACS:
-3341  3342 -3343  727  3344 0
-3341  3342 -3343  727  3345 0
-3341  3342 -3343  727 -3346 0

c  -2-1 --> break 
c    ( b^{1, 727}_2 ∧  b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧ -p_727) -> break
c  in CNF:
c    -b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨  b^{1, 727}_0 ∨  p_727 ∨ break
c  in DIMACS:
-3341 -3342  3343  727 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 727}_2 ∧ -b^{1, 727}_1 ∧ -b^{1, 727}_0 ∧ true) 
c  in CNF:
c    -b^{1, 727}_2 ∨  b^{1, 727}_1 ∨  b^{1, 727}_0 ∨ false 
c  in DIMACS:
-3341  3342  3343  0

c  3 does not represent an automaton state.
c    -(-b^{1, 727}_2 ∧  b^{1, 727}_1 ∧  b^{1, 727}_0 ∧ true) 
c  in CNF:
c     b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ false 
c  in DIMACS:
 3341 -3342 -3343  0
c  -3 does not represent an automaton state.
c    -( b^{1, 727}_2 ∧  b^{1, 727}_1 ∧  b^{1, 727}_0 ∧ true) 
c  in CNF:
c    -b^{1, 727}_2 ∨ -b^{1, 727}_1 ∨ -b^{1, 727}_0 ∨ false 
c  in DIMACS:
-3341 -3342 -3343  0

c i = 728
c  -2+1 --> -1
c    ( b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧  p_728) -> ( b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0)
c  in CNF:
c    -b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨  b^{1, 729}_2
c    -b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_1
c    -b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨  b^{1, 729}_0
c  in DIMACS:
-3344 -3345  3346 -728  3347 0
-3344 -3345  3346 -728 -3348 0
-3344 -3345  3346 -728  3349 0

c  -1+1 --> 0
c    ( b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0 ∧  p_728) -> (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧ -b^{1, 729}_0)
c  in CNF:
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_2
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_1
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_0
c  in DIMACS:
-3344  3345 -3346 -728 -3347 0
-3344  3345 -3346 -728 -3348 0
-3344  3345 -3346 -728 -3349 0

c  0+1 --> 1
c    (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧  p_728) -> (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0)
c  in CNF:
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_2
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_1
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨  b^{1, 729}_0
c  in DIMACS:
 3344  3345  3346 -728 -3347 0
 3344  3345  3346 -728 -3348 0
 3344  3345  3346 -728  3349 0

c  1+1 --> 2
c    (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0 ∧  p_728) -> (-b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0)
c  in CNF:
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_2
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨  b^{1, 729}_1
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ -p_728 ∨ -b^{1, 729}_0
c  in DIMACS:
 3344  3345 -3346 -728 -3347 0
 3344  3345 -3346 -728  3348 0
 3344  3345 -3346 -728 -3349 0

c  2+1 --> break 
c    (-b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧  p_728) -> break
c  in CNF:
c     b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 3344 -3345  3346 -728 1162 0


c  2-1 --> 1
c    (-b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧ -p_728) -> (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0)
c  in CNF:
c     b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_2
c     b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_1
c     b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨  b^{1, 729}_0
c  in DIMACS:
 3344 -3345  3346  728 -3347 0
 3344 -3345  3346  728 -3348 0
 3344 -3345  3346  728  3349 0

c  1-1 --> 0
c    (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0 ∧ -p_728) -> (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧ -b^{1, 729}_0)
c  in CNF:
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_2
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_1
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_0
c  in DIMACS:
 3344  3345 -3346  728 -3347 0
 3344  3345 -3346  728 -3348 0
 3344  3345 -3346  728 -3349 0

c  0-1 --> -1
c    (-b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧ -p_728) -> ( b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0)
c  in CNF:
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨  b^{1, 729}_2
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_1
c     b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨  b^{1, 729}_0
c  in DIMACS:
 3344  3345  3346  728  3347 0
 3344  3345  3346  728 -3348 0
 3344  3345  3346  728  3349 0

c  -1-1 --> -2
c    ( b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧  b^{1, 728}_0 ∧ -p_728) -> ( b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0)
c  in CNF:
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨  b^{1, 729}_2
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨  b^{1, 729}_1
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨  p_728 ∨ -b^{1, 729}_0
c  in DIMACS:
-3344  3345 -3346  728  3347 0
-3344  3345 -3346  728  3348 0
-3344  3345 -3346  728 -3349 0

c  -2-1 --> break 
c    ( b^{1, 728}_2 ∧  b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨  b^{1, 728}_0 ∨  p_728 ∨ break
c  in DIMACS:
-3344 -3345  3346  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 728}_2 ∧ -b^{1, 728}_1 ∧ -b^{1, 728}_0 ∧ true) 
c  in CNF:
c    -b^{1, 728}_2 ∨  b^{1, 728}_1 ∨  b^{1, 728}_0 ∨ false 
c  in DIMACS:
-3344  3345  3346  0

c  3 does not represent an automaton state.
c    -(-b^{1, 728}_2 ∧  b^{1, 728}_1 ∧  b^{1, 728}_0 ∧ true) 
c  in CNF:
c     b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ false 
c  in DIMACS:
 3344 -3345 -3346  0
c  -3 does not represent an automaton state.
c    -( b^{1, 728}_2 ∧  b^{1, 728}_1 ∧  b^{1, 728}_0 ∧ true) 
c  in CNF:
c    -b^{1, 728}_2 ∨ -b^{1, 728}_1 ∨ -b^{1, 728}_0 ∨ false 
c  in DIMACS:
-3344 -3345 -3346  0

c i = 729
c  -2+1 --> -1
c    ( b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧  p_729) -> ( b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0)
c  in CNF:
c    -b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨  b^{1, 730}_2
c    -b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_1
c    -b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨  b^{1, 730}_0
c  in DIMACS:
-3347 -3348  3349 -729  3350 0
-3347 -3348  3349 -729 -3351 0
-3347 -3348  3349 -729  3352 0

c  -1+1 --> 0
c    ( b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0 ∧  p_729) -> (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧ -b^{1, 730}_0)
c  in CNF:
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_2
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_1
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_0
c  in DIMACS:
-3347  3348 -3349 -729 -3350 0
-3347  3348 -3349 -729 -3351 0
-3347  3348 -3349 -729 -3352 0

c  0+1 --> 1
c    (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧  p_729) -> (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0)
c  in CNF:
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_2
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_1
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨  b^{1, 730}_0
c  in DIMACS:
 3347  3348  3349 -729 -3350 0
 3347  3348  3349 -729 -3351 0
 3347  3348  3349 -729  3352 0

c  1+1 --> 2
c    (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0 ∧  p_729) -> (-b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0)
c  in CNF:
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_2
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨  b^{1, 730}_1
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ -p_729 ∨ -b^{1, 730}_0
c  in DIMACS:
 3347  3348 -3349 -729 -3350 0
 3347  3348 -3349 -729  3351 0
 3347  3348 -3349 -729 -3352 0

c  2+1 --> break 
c    (-b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧  p_729) -> break
c  in CNF:
c     b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 3347 -3348  3349 -729 1162 0


c  2-1 --> 1
c    (-b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧ -p_729) -> (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0)
c  in CNF:
c     b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_2
c     b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_1
c     b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨  b^{1, 730}_0
c  in DIMACS:
 3347 -3348  3349  729 -3350 0
 3347 -3348  3349  729 -3351 0
 3347 -3348  3349  729  3352 0

c  1-1 --> 0
c    (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0 ∧ -p_729) -> (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧ -b^{1, 730}_0)
c  in CNF:
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_2
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_1
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_0
c  in DIMACS:
 3347  3348 -3349  729 -3350 0
 3347  3348 -3349  729 -3351 0
 3347  3348 -3349  729 -3352 0

c  0-1 --> -1
c    (-b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧ -p_729) -> ( b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0)
c  in CNF:
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨  b^{1, 730}_2
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_1
c     b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨  b^{1, 730}_0
c  in DIMACS:
 3347  3348  3349  729  3350 0
 3347  3348  3349  729 -3351 0
 3347  3348  3349  729  3352 0

c  -1-1 --> -2
c    ( b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧  b^{1, 729}_0 ∧ -p_729) -> ( b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0)
c  in CNF:
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨  b^{1, 730}_2
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨  b^{1, 730}_1
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨  p_729 ∨ -b^{1, 730}_0
c  in DIMACS:
-3347  3348 -3349  729  3350 0
-3347  3348 -3349  729  3351 0
-3347  3348 -3349  729 -3352 0

c  -2-1 --> break 
c    ( b^{1, 729}_2 ∧  b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨  b^{1, 729}_0 ∨  p_729 ∨ break
c  in DIMACS:
-3347 -3348  3349  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 729}_2 ∧ -b^{1, 729}_1 ∧ -b^{1, 729}_0 ∧ true) 
c  in CNF:
c    -b^{1, 729}_2 ∨  b^{1, 729}_1 ∨  b^{1, 729}_0 ∨ false 
c  in DIMACS:
-3347  3348  3349  0

c  3 does not represent an automaton state.
c    -(-b^{1, 729}_2 ∧  b^{1, 729}_1 ∧  b^{1, 729}_0 ∧ true) 
c  in CNF:
c     b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ false 
c  in DIMACS:
 3347 -3348 -3349  0
c  -3 does not represent an automaton state.
c    -( b^{1, 729}_2 ∧  b^{1, 729}_1 ∧  b^{1, 729}_0 ∧ true) 
c  in CNF:
c    -b^{1, 729}_2 ∨ -b^{1, 729}_1 ∨ -b^{1, 729}_0 ∨ false 
c  in DIMACS:
-3347 -3348 -3349  0

c i = 730
c  -2+1 --> -1
c    ( b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧  p_730) -> ( b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0)
c  in CNF:
c    -b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨  b^{1, 731}_2
c    -b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_1
c    -b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨  b^{1, 731}_0
c  in DIMACS:
-3350 -3351  3352 -730  3353 0
-3350 -3351  3352 -730 -3354 0
-3350 -3351  3352 -730  3355 0

c  -1+1 --> 0
c    ( b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0 ∧  p_730) -> (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧ -b^{1, 731}_0)
c  in CNF:
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_2
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_1
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_0
c  in DIMACS:
-3350  3351 -3352 -730 -3353 0
-3350  3351 -3352 -730 -3354 0
-3350  3351 -3352 -730 -3355 0

c  0+1 --> 1
c    (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧  p_730) -> (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0)
c  in CNF:
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_2
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_1
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨  b^{1, 731}_0
c  in DIMACS:
 3350  3351  3352 -730 -3353 0
 3350  3351  3352 -730 -3354 0
 3350  3351  3352 -730  3355 0

c  1+1 --> 2
c    (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0 ∧  p_730) -> (-b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0)
c  in CNF:
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_2
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨  b^{1, 731}_1
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ -p_730 ∨ -b^{1, 731}_0
c  in DIMACS:
 3350  3351 -3352 -730 -3353 0
 3350  3351 -3352 -730  3354 0
 3350  3351 -3352 -730 -3355 0

c  2+1 --> break 
c    (-b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧  p_730) -> break
c  in CNF:
c     b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 3350 -3351  3352 -730 1162 0


c  2-1 --> 1
c    (-b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧ -p_730) -> (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0)
c  in CNF:
c     b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_2
c     b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_1
c     b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨  b^{1, 731}_0
c  in DIMACS:
 3350 -3351  3352  730 -3353 0
 3350 -3351  3352  730 -3354 0
 3350 -3351  3352  730  3355 0

c  1-1 --> 0
c    (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0 ∧ -p_730) -> (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧ -b^{1, 731}_0)
c  in CNF:
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_2
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_1
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_0
c  in DIMACS:
 3350  3351 -3352  730 -3353 0
 3350  3351 -3352  730 -3354 0
 3350  3351 -3352  730 -3355 0

c  0-1 --> -1
c    (-b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧ -p_730) -> ( b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0)
c  in CNF:
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨  b^{1, 731}_2
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_1
c     b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨  b^{1, 731}_0
c  in DIMACS:
 3350  3351  3352  730  3353 0
 3350  3351  3352  730 -3354 0
 3350  3351  3352  730  3355 0

c  -1-1 --> -2
c    ( b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧  b^{1, 730}_0 ∧ -p_730) -> ( b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0)
c  in CNF:
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨  b^{1, 731}_2
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨  b^{1, 731}_1
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨  p_730 ∨ -b^{1, 731}_0
c  in DIMACS:
-3350  3351 -3352  730  3353 0
-3350  3351 -3352  730  3354 0
-3350  3351 -3352  730 -3355 0

c  -2-1 --> break 
c    ( b^{1, 730}_2 ∧  b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨  b^{1, 730}_0 ∨  p_730 ∨ break
c  in DIMACS:
-3350 -3351  3352  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 730}_2 ∧ -b^{1, 730}_1 ∧ -b^{1, 730}_0 ∧ true) 
c  in CNF:
c    -b^{1, 730}_2 ∨  b^{1, 730}_1 ∨  b^{1, 730}_0 ∨ false 
c  in DIMACS:
-3350  3351  3352  0

c  3 does not represent an automaton state.
c    -(-b^{1, 730}_2 ∧  b^{1, 730}_1 ∧  b^{1, 730}_0 ∧ true) 
c  in CNF:
c     b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ false 
c  in DIMACS:
 3350 -3351 -3352  0
c  -3 does not represent an automaton state.
c    -( b^{1, 730}_2 ∧  b^{1, 730}_1 ∧  b^{1, 730}_0 ∧ true) 
c  in CNF:
c    -b^{1, 730}_2 ∨ -b^{1, 730}_1 ∨ -b^{1, 730}_0 ∨ false 
c  in DIMACS:
-3350 -3351 -3352  0

c i = 731
c  -2+1 --> -1
c    ( b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧  p_731) -> ( b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0)
c  in CNF:
c    -b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨  b^{1, 732}_2
c    -b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_1
c    -b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨  b^{1, 732}_0
c  in DIMACS:
-3353 -3354  3355 -731  3356 0
-3353 -3354  3355 -731 -3357 0
-3353 -3354  3355 -731  3358 0

c  -1+1 --> 0
c    ( b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0 ∧  p_731) -> (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧ -b^{1, 732}_0)
c  in CNF:
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_2
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_1
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_0
c  in DIMACS:
-3353  3354 -3355 -731 -3356 0
-3353  3354 -3355 -731 -3357 0
-3353  3354 -3355 -731 -3358 0

c  0+1 --> 1
c    (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧  p_731) -> (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0)
c  in CNF:
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_2
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_1
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨  b^{1, 732}_0
c  in DIMACS:
 3353  3354  3355 -731 -3356 0
 3353  3354  3355 -731 -3357 0
 3353  3354  3355 -731  3358 0

c  1+1 --> 2
c    (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0 ∧  p_731) -> (-b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0)
c  in CNF:
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_2
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨  b^{1, 732}_1
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ -p_731 ∨ -b^{1, 732}_0
c  in DIMACS:
 3353  3354 -3355 -731 -3356 0
 3353  3354 -3355 -731  3357 0
 3353  3354 -3355 -731 -3358 0

c  2+1 --> break 
c    (-b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧  p_731) -> break
c  in CNF:
c     b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ -p_731 ∨ break
c  in DIMACS:
 3353 -3354  3355 -731 1162 0


c  2-1 --> 1
c    (-b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧ -p_731) -> (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0)
c  in CNF:
c     b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_2
c     b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_1
c     b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨  b^{1, 732}_0
c  in DIMACS:
 3353 -3354  3355  731 -3356 0
 3353 -3354  3355  731 -3357 0
 3353 -3354  3355  731  3358 0

c  1-1 --> 0
c    (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0 ∧ -p_731) -> (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧ -b^{1, 732}_0)
c  in CNF:
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_2
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_1
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_0
c  in DIMACS:
 3353  3354 -3355  731 -3356 0
 3353  3354 -3355  731 -3357 0
 3353  3354 -3355  731 -3358 0

c  0-1 --> -1
c    (-b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧ -p_731) -> ( b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0)
c  in CNF:
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨  b^{1, 732}_2
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_1
c     b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨  b^{1, 732}_0
c  in DIMACS:
 3353  3354  3355  731  3356 0
 3353  3354  3355  731 -3357 0
 3353  3354  3355  731  3358 0

c  -1-1 --> -2
c    ( b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧  b^{1, 731}_0 ∧ -p_731) -> ( b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0)
c  in CNF:
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨  b^{1, 732}_2
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨  b^{1, 732}_1
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨  p_731 ∨ -b^{1, 732}_0
c  in DIMACS:
-3353  3354 -3355  731  3356 0
-3353  3354 -3355  731  3357 0
-3353  3354 -3355  731 -3358 0

c  -2-1 --> break 
c    ( b^{1, 731}_2 ∧  b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧ -p_731) -> break
c  in CNF:
c    -b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨  b^{1, 731}_0 ∨  p_731 ∨ break
c  in DIMACS:
-3353 -3354  3355  731 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 731}_2 ∧ -b^{1, 731}_1 ∧ -b^{1, 731}_0 ∧ true) 
c  in CNF:
c    -b^{1, 731}_2 ∨  b^{1, 731}_1 ∨  b^{1, 731}_0 ∨ false 
c  in DIMACS:
-3353  3354  3355  0

c  3 does not represent an automaton state.
c    -(-b^{1, 731}_2 ∧  b^{1, 731}_1 ∧  b^{1, 731}_0 ∧ true) 
c  in CNF:
c     b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ false 
c  in DIMACS:
 3353 -3354 -3355  0
c  -3 does not represent an automaton state.
c    -( b^{1, 731}_2 ∧  b^{1, 731}_1 ∧  b^{1, 731}_0 ∧ true) 
c  in CNF:
c    -b^{1, 731}_2 ∨ -b^{1, 731}_1 ∨ -b^{1, 731}_0 ∨ false 
c  in DIMACS:
-3353 -3354 -3355  0

c i = 732
c  -2+1 --> -1
c    ( b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧  p_732) -> ( b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0)
c  in CNF:
c    -b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨  b^{1, 733}_2
c    -b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_1
c    -b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨  b^{1, 733}_0
c  in DIMACS:
-3356 -3357  3358 -732  3359 0
-3356 -3357  3358 -732 -3360 0
-3356 -3357  3358 -732  3361 0

c  -1+1 --> 0
c    ( b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0 ∧  p_732) -> (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧ -b^{1, 733}_0)
c  in CNF:
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_2
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_1
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_0
c  in DIMACS:
-3356  3357 -3358 -732 -3359 0
-3356  3357 -3358 -732 -3360 0
-3356  3357 -3358 -732 -3361 0

c  0+1 --> 1
c    (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧  p_732) -> (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0)
c  in CNF:
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_2
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_1
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨  b^{1, 733}_0
c  in DIMACS:
 3356  3357  3358 -732 -3359 0
 3356  3357  3358 -732 -3360 0
 3356  3357  3358 -732  3361 0

c  1+1 --> 2
c    (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0 ∧  p_732) -> (-b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0)
c  in CNF:
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_2
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨  b^{1, 733}_1
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ -p_732 ∨ -b^{1, 733}_0
c  in DIMACS:
 3356  3357 -3358 -732 -3359 0
 3356  3357 -3358 -732  3360 0
 3356  3357 -3358 -732 -3361 0

c  2+1 --> break 
c    (-b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧  p_732) -> break
c  in CNF:
c     b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 3356 -3357  3358 -732 1162 0


c  2-1 --> 1
c    (-b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧ -p_732) -> (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0)
c  in CNF:
c     b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_2
c     b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_1
c     b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨  b^{1, 733}_0
c  in DIMACS:
 3356 -3357  3358  732 -3359 0
 3356 -3357  3358  732 -3360 0
 3356 -3357  3358  732  3361 0

c  1-1 --> 0
c    (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0 ∧ -p_732) -> (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧ -b^{1, 733}_0)
c  in CNF:
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_2
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_1
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_0
c  in DIMACS:
 3356  3357 -3358  732 -3359 0
 3356  3357 -3358  732 -3360 0
 3356  3357 -3358  732 -3361 0

c  0-1 --> -1
c    (-b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧ -p_732) -> ( b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0)
c  in CNF:
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨  b^{1, 733}_2
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_1
c     b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨  b^{1, 733}_0
c  in DIMACS:
 3356  3357  3358  732  3359 0
 3356  3357  3358  732 -3360 0
 3356  3357  3358  732  3361 0

c  -1-1 --> -2
c    ( b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧  b^{1, 732}_0 ∧ -p_732) -> ( b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0)
c  in CNF:
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨  b^{1, 733}_2
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨  b^{1, 733}_1
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨  p_732 ∨ -b^{1, 733}_0
c  in DIMACS:
-3356  3357 -3358  732  3359 0
-3356  3357 -3358  732  3360 0
-3356  3357 -3358  732 -3361 0

c  -2-1 --> break 
c    ( b^{1, 732}_2 ∧  b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨  b^{1, 732}_0 ∨  p_732 ∨ break
c  in DIMACS:
-3356 -3357  3358  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 732}_2 ∧ -b^{1, 732}_1 ∧ -b^{1, 732}_0 ∧ true) 
c  in CNF:
c    -b^{1, 732}_2 ∨  b^{1, 732}_1 ∨  b^{1, 732}_0 ∨ false 
c  in DIMACS:
-3356  3357  3358  0

c  3 does not represent an automaton state.
c    -(-b^{1, 732}_2 ∧  b^{1, 732}_1 ∧  b^{1, 732}_0 ∧ true) 
c  in CNF:
c     b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ false 
c  in DIMACS:
 3356 -3357 -3358  0
c  -3 does not represent an automaton state.
c    -( b^{1, 732}_2 ∧  b^{1, 732}_1 ∧  b^{1, 732}_0 ∧ true) 
c  in CNF:
c    -b^{1, 732}_2 ∨ -b^{1, 732}_1 ∨ -b^{1, 732}_0 ∨ false 
c  in DIMACS:
-3356 -3357 -3358  0

c i = 733
c  -2+1 --> -1
c    ( b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧  p_733) -> ( b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0)
c  in CNF:
c    -b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨  b^{1, 734}_2
c    -b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_1
c    -b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨  b^{1, 734}_0
c  in DIMACS:
-3359 -3360  3361 -733  3362 0
-3359 -3360  3361 -733 -3363 0
-3359 -3360  3361 -733  3364 0

c  -1+1 --> 0
c    ( b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0 ∧  p_733) -> (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧ -b^{1, 734}_0)
c  in CNF:
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_2
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_1
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_0
c  in DIMACS:
-3359  3360 -3361 -733 -3362 0
-3359  3360 -3361 -733 -3363 0
-3359  3360 -3361 -733 -3364 0

c  0+1 --> 1
c    (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧  p_733) -> (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0)
c  in CNF:
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_2
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_1
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨  b^{1, 734}_0
c  in DIMACS:
 3359  3360  3361 -733 -3362 0
 3359  3360  3361 -733 -3363 0
 3359  3360  3361 -733  3364 0

c  1+1 --> 2
c    (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0 ∧  p_733) -> (-b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0)
c  in CNF:
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_2
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨  b^{1, 734}_1
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ -p_733 ∨ -b^{1, 734}_0
c  in DIMACS:
 3359  3360 -3361 -733 -3362 0
 3359  3360 -3361 -733  3363 0
 3359  3360 -3361 -733 -3364 0

c  2+1 --> break 
c    (-b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧  p_733) -> break
c  in CNF:
c     b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ -p_733 ∨ break
c  in DIMACS:
 3359 -3360  3361 -733 1162 0


c  2-1 --> 1
c    (-b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧ -p_733) -> (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0)
c  in CNF:
c     b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_2
c     b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_1
c     b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨  b^{1, 734}_0
c  in DIMACS:
 3359 -3360  3361  733 -3362 0
 3359 -3360  3361  733 -3363 0
 3359 -3360  3361  733  3364 0

c  1-1 --> 0
c    (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0 ∧ -p_733) -> (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧ -b^{1, 734}_0)
c  in CNF:
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_2
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_1
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_0
c  in DIMACS:
 3359  3360 -3361  733 -3362 0
 3359  3360 -3361  733 -3363 0
 3359  3360 -3361  733 -3364 0

c  0-1 --> -1
c    (-b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧ -p_733) -> ( b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0)
c  in CNF:
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨  b^{1, 734}_2
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_1
c     b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨  b^{1, 734}_0
c  in DIMACS:
 3359  3360  3361  733  3362 0
 3359  3360  3361  733 -3363 0
 3359  3360  3361  733  3364 0

c  -1-1 --> -2
c    ( b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧  b^{1, 733}_0 ∧ -p_733) -> ( b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0)
c  in CNF:
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨  b^{1, 734}_2
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨  b^{1, 734}_1
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨  p_733 ∨ -b^{1, 734}_0
c  in DIMACS:
-3359  3360 -3361  733  3362 0
-3359  3360 -3361  733  3363 0
-3359  3360 -3361  733 -3364 0

c  -2-1 --> break 
c    ( b^{1, 733}_2 ∧  b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧ -p_733) -> break
c  in CNF:
c    -b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨  b^{1, 733}_0 ∨  p_733 ∨ break
c  in DIMACS:
-3359 -3360  3361  733 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 733}_2 ∧ -b^{1, 733}_1 ∧ -b^{1, 733}_0 ∧ true) 
c  in CNF:
c    -b^{1, 733}_2 ∨  b^{1, 733}_1 ∨  b^{1, 733}_0 ∨ false 
c  in DIMACS:
-3359  3360  3361  0

c  3 does not represent an automaton state.
c    -(-b^{1, 733}_2 ∧  b^{1, 733}_1 ∧  b^{1, 733}_0 ∧ true) 
c  in CNF:
c     b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ false 
c  in DIMACS:
 3359 -3360 -3361  0
c  -3 does not represent an automaton state.
c    -( b^{1, 733}_2 ∧  b^{1, 733}_1 ∧  b^{1, 733}_0 ∧ true) 
c  in CNF:
c    -b^{1, 733}_2 ∨ -b^{1, 733}_1 ∨ -b^{1, 733}_0 ∨ false 
c  in DIMACS:
-3359 -3360 -3361  0

c i = 734
c  -2+1 --> -1
c    ( b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧  p_734) -> ( b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0)
c  in CNF:
c    -b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨  b^{1, 735}_2
c    -b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_1
c    -b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨  b^{1, 735}_0
c  in DIMACS:
-3362 -3363  3364 -734  3365 0
-3362 -3363  3364 -734 -3366 0
-3362 -3363  3364 -734  3367 0

c  -1+1 --> 0
c    ( b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0 ∧  p_734) -> (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧ -b^{1, 735}_0)
c  in CNF:
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_2
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_1
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_0
c  in DIMACS:
-3362  3363 -3364 -734 -3365 0
-3362  3363 -3364 -734 -3366 0
-3362  3363 -3364 -734 -3367 0

c  0+1 --> 1
c    (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧  p_734) -> (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0)
c  in CNF:
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_2
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_1
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨  b^{1, 735}_0
c  in DIMACS:
 3362  3363  3364 -734 -3365 0
 3362  3363  3364 -734 -3366 0
 3362  3363  3364 -734  3367 0

c  1+1 --> 2
c    (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0 ∧  p_734) -> (-b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0)
c  in CNF:
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_2
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨  b^{1, 735}_1
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ -p_734 ∨ -b^{1, 735}_0
c  in DIMACS:
 3362  3363 -3364 -734 -3365 0
 3362  3363 -3364 -734  3366 0
 3362  3363 -3364 -734 -3367 0

c  2+1 --> break 
c    (-b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧  p_734) -> break
c  in CNF:
c     b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ -p_734 ∨ break
c  in DIMACS:
 3362 -3363  3364 -734 1162 0


c  2-1 --> 1
c    (-b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧ -p_734) -> (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0)
c  in CNF:
c     b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_2
c     b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_1
c     b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨  b^{1, 735}_0
c  in DIMACS:
 3362 -3363  3364  734 -3365 0
 3362 -3363  3364  734 -3366 0
 3362 -3363  3364  734  3367 0

c  1-1 --> 0
c    (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0 ∧ -p_734) -> (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧ -b^{1, 735}_0)
c  in CNF:
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_2
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_1
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_0
c  in DIMACS:
 3362  3363 -3364  734 -3365 0
 3362  3363 -3364  734 -3366 0
 3362  3363 -3364  734 -3367 0

c  0-1 --> -1
c    (-b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧ -p_734) -> ( b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0)
c  in CNF:
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨  b^{1, 735}_2
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_1
c     b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨  b^{1, 735}_0
c  in DIMACS:
 3362  3363  3364  734  3365 0
 3362  3363  3364  734 -3366 0
 3362  3363  3364  734  3367 0

c  -1-1 --> -2
c    ( b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧  b^{1, 734}_0 ∧ -p_734) -> ( b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0)
c  in CNF:
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨  b^{1, 735}_2
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨  b^{1, 735}_1
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨  p_734 ∨ -b^{1, 735}_0
c  in DIMACS:
-3362  3363 -3364  734  3365 0
-3362  3363 -3364  734  3366 0
-3362  3363 -3364  734 -3367 0

c  -2-1 --> break 
c    ( b^{1, 734}_2 ∧  b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧ -p_734) -> break
c  in CNF:
c    -b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨  b^{1, 734}_0 ∨  p_734 ∨ break
c  in DIMACS:
-3362 -3363  3364  734 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 734}_2 ∧ -b^{1, 734}_1 ∧ -b^{1, 734}_0 ∧ true) 
c  in CNF:
c    -b^{1, 734}_2 ∨  b^{1, 734}_1 ∨  b^{1, 734}_0 ∨ false 
c  in DIMACS:
-3362  3363  3364  0

c  3 does not represent an automaton state.
c    -(-b^{1, 734}_2 ∧  b^{1, 734}_1 ∧  b^{1, 734}_0 ∧ true) 
c  in CNF:
c     b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ false 
c  in DIMACS:
 3362 -3363 -3364  0
c  -3 does not represent an automaton state.
c    -( b^{1, 734}_2 ∧  b^{1, 734}_1 ∧  b^{1, 734}_0 ∧ true) 
c  in CNF:
c    -b^{1, 734}_2 ∨ -b^{1, 734}_1 ∨ -b^{1, 734}_0 ∨ false 
c  in DIMACS:
-3362 -3363 -3364  0

c i = 735
c  -2+1 --> -1
c    ( b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧  p_735) -> ( b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0)
c  in CNF:
c    -b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨  b^{1, 736}_2
c    -b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_1
c    -b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨  b^{1, 736}_0
c  in DIMACS:
-3365 -3366  3367 -735  3368 0
-3365 -3366  3367 -735 -3369 0
-3365 -3366  3367 -735  3370 0

c  -1+1 --> 0
c    ( b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0 ∧  p_735) -> (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧ -b^{1, 736}_0)
c  in CNF:
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_2
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_1
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_0
c  in DIMACS:
-3365  3366 -3367 -735 -3368 0
-3365  3366 -3367 -735 -3369 0
-3365  3366 -3367 -735 -3370 0

c  0+1 --> 1
c    (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧  p_735) -> (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0)
c  in CNF:
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_2
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_1
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨  b^{1, 736}_0
c  in DIMACS:
 3365  3366  3367 -735 -3368 0
 3365  3366  3367 -735 -3369 0
 3365  3366  3367 -735  3370 0

c  1+1 --> 2
c    (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0 ∧  p_735) -> (-b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0)
c  in CNF:
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_2
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨  b^{1, 736}_1
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ -p_735 ∨ -b^{1, 736}_0
c  in DIMACS:
 3365  3366 -3367 -735 -3368 0
 3365  3366 -3367 -735  3369 0
 3365  3366 -3367 -735 -3370 0

c  2+1 --> break 
c    (-b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧  p_735) -> break
c  in CNF:
c     b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 3365 -3366  3367 -735 1162 0


c  2-1 --> 1
c    (-b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧ -p_735) -> (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0)
c  in CNF:
c     b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_2
c     b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_1
c     b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨  b^{1, 736}_0
c  in DIMACS:
 3365 -3366  3367  735 -3368 0
 3365 -3366  3367  735 -3369 0
 3365 -3366  3367  735  3370 0

c  1-1 --> 0
c    (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0 ∧ -p_735) -> (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧ -b^{1, 736}_0)
c  in CNF:
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_2
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_1
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_0
c  in DIMACS:
 3365  3366 -3367  735 -3368 0
 3365  3366 -3367  735 -3369 0
 3365  3366 -3367  735 -3370 0

c  0-1 --> -1
c    (-b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧ -p_735) -> ( b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0)
c  in CNF:
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨  b^{1, 736}_2
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_1
c     b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨  b^{1, 736}_0
c  in DIMACS:
 3365  3366  3367  735  3368 0
 3365  3366  3367  735 -3369 0
 3365  3366  3367  735  3370 0

c  -1-1 --> -2
c    ( b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧  b^{1, 735}_0 ∧ -p_735) -> ( b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0)
c  in CNF:
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨  b^{1, 736}_2
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨  b^{1, 736}_1
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨  p_735 ∨ -b^{1, 736}_0
c  in DIMACS:
-3365  3366 -3367  735  3368 0
-3365  3366 -3367  735  3369 0
-3365  3366 -3367  735 -3370 0

c  -2-1 --> break 
c    ( b^{1, 735}_2 ∧  b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨  b^{1, 735}_0 ∨  p_735 ∨ break
c  in DIMACS:
-3365 -3366  3367  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 735}_2 ∧ -b^{1, 735}_1 ∧ -b^{1, 735}_0 ∧ true) 
c  in CNF:
c    -b^{1, 735}_2 ∨  b^{1, 735}_1 ∨  b^{1, 735}_0 ∨ false 
c  in DIMACS:
-3365  3366  3367  0

c  3 does not represent an automaton state.
c    -(-b^{1, 735}_2 ∧  b^{1, 735}_1 ∧  b^{1, 735}_0 ∧ true) 
c  in CNF:
c     b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ false 
c  in DIMACS:
 3365 -3366 -3367  0
c  -3 does not represent an automaton state.
c    -( b^{1, 735}_2 ∧  b^{1, 735}_1 ∧  b^{1, 735}_0 ∧ true) 
c  in CNF:
c    -b^{1, 735}_2 ∨ -b^{1, 735}_1 ∨ -b^{1, 735}_0 ∨ false 
c  in DIMACS:
-3365 -3366 -3367  0

c i = 736
c  -2+1 --> -1
c    ( b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧  p_736) -> ( b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0)
c  in CNF:
c    -b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨  b^{1, 737}_2
c    -b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_1
c    -b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨  b^{1, 737}_0
c  in DIMACS:
-3368 -3369  3370 -736  3371 0
-3368 -3369  3370 -736 -3372 0
-3368 -3369  3370 -736  3373 0

c  -1+1 --> 0
c    ( b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0 ∧  p_736) -> (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧ -b^{1, 737}_0)
c  in CNF:
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_2
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_1
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_0
c  in DIMACS:
-3368  3369 -3370 -736 -3371 0
-3368  3369 -3370 -736 -3372 0
-3368  3369 -3370 -736 -3373 0

c  0+1 --> 1
c    (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧  p_736) -> (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0)
c  in CNF:
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_2
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_1
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨  b^{1, 737}_0
c  in DIMACS:
 3368  3369  3370 -736 -3371 0
 3368  3369  3370 -736 -3372 0
 3368  3369  3370 -736  3373 0

c  1+1 --> 2
c    (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0 ∧  p_736) -> (-b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0)
c  in CNF:
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_2
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨  b^{1, 737}_1
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ -p_736 ∨ -b^{1, 737}_0
c  in DIMACS:
 3368  3369 -3370 -736 -3371 0
 3368  3369 -3370 -736  3372 0
 3368  3369 -3370 -736 -3373 0

c  2+1 --> break 
c    (-b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧  p_736) -> break
c  in CNF:
c     b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 3368 -3369  3370 -736 1162 0


c  2-1 --> 1
c    (-b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧ -p_736) -> (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0)
c  in CNF:
c     b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_2
c     b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_1
c     b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨  b^{1, 737}_0
c  in DIMACS:
 3368 -3369  3370  736 -3371 0
 3368 -3369  3370  736 -3372 0
 3368 -3369  3370  736  3373 0

c  1-1 --> 0
c    (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0 ∧ -p_736) -> (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧ -b^{1, 737}_0)
c  in CNF:
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_2
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_1
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_0
c  in DIMACS:
 3368  3369 -3370  736 -3371 0
 3368  3369 -3370  736 -3372 0
 3368  3369 -3370  736 -3373 0

c  0-1 --> -1
c    (-b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧ -p_736) -> ( b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0)
c  in CNF:
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨  b^{1, 737}_2
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_1
c     b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨  b^{1, 737}_0
c  in DIMACS:
 3368  3369  3370  736  3371 0
 3368  3369  3370  736 -3372 0
 3368  3369  3370  736  3373 0

c  -1-1 --> -2
c    ( b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧  b^{1, 736}_0 ∧ -p_736) -> ( b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0)
c  in CNF:
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨  b^{1, 737}_2
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨  b^{1, 737}_1
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨  p_736 ∨ -b^{1, 737}_0
c  in DIMACS:
-3368  3369 -3370  736  3371 0
-3368  3369 -3370  736  3372 0
-3368  3369 -3370  736 -3373 0

c  -2-1 --> break 
c    ( b^{1, 736}_2 ∧  b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨  b^{1, 736}_0 ∨  p_736 ∨ break
c  in DIMACS:
-3368 -3369  3370  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 736}_2 ∧ -b^{1, 736}_1 ∧ -b^{1, 736}_0 ∧ true) 
c  in CNF:
c    -b^{1, 736}_2 ∨  b^{1, 736}_1 ∨  b^{1, 736}_0 ∨ false 
c  in DIMACS:
-3368  3369  3370  0

c  3 does not represent an automaton state.
c    -(-b^{1, 736}_2 ∧  b^{1, 736}_1 ∧  b^{1, 736}_0 ∧ true) 
c  in CNF:
c     b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ false 
c  in DIMACS:
 3368 -3369 -3370  0
c  -3 does not represent an automaton state.
c    -( b^{1, 736}_2 ∧  b^{1, 736}_1 ∧  b^{1, 736}_0 ∧ true) 
c  in CNF:
c    -b^{1, 736}_2 ∨ -b^{1, 736}_1 ∨ -b^{1, 736}_0 ∨ false 
c  in DIMACS:
-3368 -3369 -3370  0

c i = 737
c  -2+1 --> -1
c    ( b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧  p_737) -> ( b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0)
c  in CNF:
c    -b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨  b^{1, 738}_2
c    -b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_1
c    -b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨  b^{1, 738}_0
c  in DIMACS:
-3371 -3372  3373 -737  3374 0
-3371 -3372  3373 -737 -3375 0
-3371 -3372  3373 -737  3376 0

c  -1+1 --> 0
c    ( b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0 ∧  p_737) -> (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧ -b^{1, 738}_0)
c  in CNF:
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_2
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_1
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_0
c  in DIMACS:
-3371  3372 -3373 -737 -3374 0
-3371  3372 -3373 -737 -3375 0
-3371  3372 -3373 -737 -3376 0

c  0+1 --> 1
c    (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧  p_737) -> (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0)
c  in CNF:
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_2
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_1
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨  b^{1, 738}_0
c  in DIMACS:
 3371  3372  3373 -737 -3374 0
 3371  3372  3373 -737 -3375 0
 3371  3372  3373 -737  3376 0

c  1+1 --> 2
c    (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0 ∧  p_737) -> (-b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0)
c  in CNF:
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_2
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨  b^{1, 738}_1
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ -p_737 ∨ -b^{1, 738}_0
c  in DIMACS:
 3371  3372 -3373 -737 -3374 0
 3371  3372 -3373 -737  3375 0
 3371  3372 -3373 -737 -3376 0

c  2+1 --> break 
c    (-b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧  p_737) -> break
c  in CNF:
c     b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ -p_737 ∨ break
c  in DIMACS:
 3371 -3372  3373 -737 1162 0


c  2-1 --> 1
c    (-b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧ -p_737) -> (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0)
c  in CNF:
c     b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_2
c     b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_1
c     b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨  b^{1, 738}_0
c  in DIMACS:
 3371 -3372  3373  737 -3374 0
 3371 -3372  3373  737 -3375 0
 3371 -3372  3373  737  3376 0

c  1-1 --> 0
c    (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0 ∧ -p_737) -> (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧ -b^{1, 738}_0)
c  in CNF:
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_2
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_1
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_0
c  in DIMACS:
 3371  3372 -3373  737 -3374 0
 3371  3372 -3373  737 -3375 0
 3371  3372 -3373  737 -3376 0

c  0-1 --> -1
c    (-b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧ -p_737) -> ( b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0)
c  in CNF:
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨  b^{1, 738}_2
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_1
c     b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨  b^{1, 738}_0
c  in DIMACS:
 3371  3372  3373  737  3374 0
 3371  3372  3373  737 -3375 0
 3371  3372  3373  737  3376 0

c  -1-1 --> -2
c    ( b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧  b^{1, 737}_0 ∧ -p_737) -> ( b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0)
c  in CNF:
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨  b^{1, 738}_2
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨  b^{1, 738}_1
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨  p_737 ∨ -b^{1, 738}_0
c  in DIMACS:
-3371  3372 -3373  737  3374 0
-3371  3372 -3373  737  3375 0
-3371  3372 -3373  737 -3376 0

c  -2-1 --> break 
c    ( b^{1, 737}_2 ∧  b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧ -p_737) -> break
c  in CNF:
c    -b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨  b^{1, 737}_0 ∨  p_737 ∨ break
c  in DIMACS:
-3371 -3372  3373  737 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 737}_2 ∧ -b^{1, 737}_1 ∧ -b^{1, 737}_0 ∧ true) 
c  in CNF:
c    -b^{1, 737}_2 ∨  b^{1, 737}_1 ∨  b^{1, 737}_0 ∨ false 
c  in DIMACS:
-3371  3372  3373  0

c  3 does not represent an automaton state.
c    -(-b^{1, 737}_2 ∧  b^{1, 737}_1 ∧  b^{1, 737}_0 ∧ true) 
c  in CNF:
c     b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ false 
c  in DIMACS:
 3371 -3372 -3373  0
c  -3 does not represent an automaton state.
c    -( b^{1, 737}_2 ∧  b^{1, 737}_1 ∧  b^{1, 737}_0 ∧ true) 
c  in CNF:
c    -b^{1, 737}_2 ∨ -b^{1, 737}_1 ∨ -b^{1, 737}_0 ∨ false 
c  in DIMACS:
-3371 -3372 -3373  0

c i = 738
c  -2+1 --> -1
c    ( b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧  p_738) -> ( b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0)
c  in CNF:
c    -b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨  b^{1, 739}_2
c    -b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_1
c    -b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨  b^{1, 739}_0
c  in DIMACS:
-3374 -3375  3376 -738  3377 0
-3374 -3375  3376 -738 -3378 0
-3374 -3375  3376 -738  3379 0

c  -1+1 --> 0
c    ( b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0 ∧  p_738) -> (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧ -b^{1, 739}_0)
c  in CNF:
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_2
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_1
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_0
c  in DIMACS:
-3374  3375 -3376 -738 -3377 0
-3374  3375 -3376 -738 -3378 0
-3374  3375 -3376 -738 -3379 0

c  0+1 --> 1
c    (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧  p_738) -> (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0)
c  in CNF:
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_2
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_1
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨  b^{1, 739}_0
c  in DIMACS:
 3374  3375  3376 -738 -3377 0
 3374  3375  3376 -738 -3378 0
 3374  3375  3376 -738  3379 0

c  1+1 --> 2
c    (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0 ∧  p_738) -> (-b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0)
c  in CNF:
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_2
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨  b^{1, 739}_1
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ -p_738 ∨ -b^{1, 739}_0
c  in DIMACS:
 3374  3375 -3376 -738 -3377 0
 3374  3375 -3376 -738  3378 0
 3374  3375 -3376 -738 -3379 0

c  2+1 --> break 
c    (-b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧  p_738) -> break
c  in CNF:
c     b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 3374 -3375  3376 -738 1162 0


c  2-1 --> 1
c    (-b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧ -p_738) -> (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0)
c  in CNF:
c     b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_2
c     b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_1
c     b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨  b^{1, 739}_0
c  in DIMACS:
 3374 -3375  3376  738 -3377 0
 3374 -3375  3376  738 -3378 0
 3374 -3375  3376  738  3379 0

c  1-1 --> 0
c    (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0 ∧ -p_738) -> (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧ -b^{1, 739}_0)
c  in CNF:
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_2
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_1
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_0
c  in DIMACS:
 3374  3375 -3376  738 -3377 0
 3374  3375 -3376  738 -3378 0
 3374  3375 -3376  738 -3379 0

c  0-1 --> -1
c    (-b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧ -p_738) -> ( b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0)
c  in CNF:
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨  b^{1, 739}_2
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_1
c     b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨  b^{1, 739}_0
c  in DIMACS:
 3374  3375  3376  738  3377 0
 3374  3375  3376  738 -3378 0
 3374  3375  3376  738  3379 0

c  -1-1 --> -2
c    ( b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧  b^{1, 738}_0 ∧ -p_738) -> ( b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0)
c  in CNF:
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨  b^{1, 739}_2
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨  b^{1, 739}_1
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨  p_738 ∨ -b^{1, 739}_0
c  in DIMACS:
-3374  3375 -3376  738  3377 0
-3374  3375 -3376  738  3378 0
-3374  3375 -3376  738 -3379 0

c  -2-1 --> break 
c    ( b^{1, 738}_2 ∧  b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨  b^{1, 738}_0 ∨  p_738 ∨ break
c  in DIMACS:
-3374 -3375  3376  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 738}_2 ∧ -b^{1, 738}_1 ∧ -b^{1, 738}_0 ∧ true) 
c  in CNF:
c    -b^{1, 738}_2 ∨  b^{1, 738}_1 ∨  b^{1, 738}_0 ∨ false 
c  in DIMACS:
-3374  3375  3376  0

c  3 does not represent an automaton state.
c    -(-b^{1, 738}_2 ∧  b^{1, 738}_1 ∧  b^{1, 738}_0 ∧ true) 
c  in CNF:
c     b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ false 
c  in DIMACS:
 3374 -3375 -3376  0
c  -3 does not represent an automaton state.
c    -( b^{1, 738}_2 ∧  b^{1, 738}_1 ∧  b^{1, 738}_0 ∧ true) 
c  in CNF:
c    -b^{1, 738}_2 ∨ -b^{1, 738}_1 ∨ -b^{1, 738}_0 ∨ false 
c  in DIMACS:
-3374 -3375 -3376  0

c i = 739
c  -2+1 --> -1
c    ( b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧  p_739) -> ( b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0)
c  in CNF:
c    -b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨  b^{1, 740}_2
c    -b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_1
c    -b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨  b^{1, 740}_0
c  in DIMACS:
-3377 -3378  3379 -739  3380 0
-3377 -3378  3379 -739 -3381 0
-3377 -3378  3379 -739  3382 0

c  -1+1 --> 0
c    ( b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0 ∧  p_739) -> (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧ -b^{1, 740}_0)
c  in CNF:
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_2
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_1
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_0
c  in DIMACS:
-3377  3378 -3379 -739 -3380 0
-3377  3378 -3379 -739 -3381 0
-3377  3378 -3379 -739 -3382 0

c  0+1 --> 1
c    (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧  p_739) -> (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0)
c  in CNF:
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_2
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_1
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨  b^{1, 740}_0
c  in DIMACS:
 3377  3378  3379 -739 -3380 0
 3377  3378  3379 -739 -3381 0
 3377  3378  3379 -739  3382 0

c  1+1 --> 2
c    (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0 ∧  p_739) -> (-b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0)
c  in CNF:
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_2
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨  b^{1, 740}_1
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ -p_739 ∨ -b^{1, 740}_0
c  in DIMACS:
 3377  3378 -3379 -739 -3380 0
 3377  3378 -3379 -739  3381 0
 3377  3378 -3379 -739 -3382 0

c  2+1 --> break 
c    (-b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧  p_739) -> break
c  in CNF:
c     b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ -p_739 ∨ break
c  in DIMACS:
 3377 -3378  3379 -739 1162 0


c  2-1 --> 1
c    (-b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧ -p_739) -> (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0)
c  in CNF:
c     b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_2
c     b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_1
c     b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨  b^{1, 740}_0
c  in DIMACS:
 3377 -3378  3379  739 -3380 0
 3377 -3378  3379  739 -3381 0
 3377 -3378  3379  739  3382 0

c  1-1 --> 0
c    (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0 ∧ -p_739) -> (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧ -b^{1, 740}_0)
c  in CNF:
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_2
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_1
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_0
c  in DIMACS:
 3377  3378 -3379  739 -3380 0
 3377  3378 -3379  739 -3381 0
 3377  3378 -3379  739 -3382 0

c  0-1 --> -1
c    (-b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧ -p_739) -> ( b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0)
c  in CNF:
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨  b^{1, 740}_2
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_1
c     b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨  b^{1, 740}_0
c  in DIMACS:
 3377  3378  3379  739  3380 0
 3377  3378  3379  739 -3381 0
 3377  3378  3379  739  3382 0

c  -1-1 --> -2
c    ( b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧  b^{1, 739}_0 ∧ -p_739) -> ( b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0)
c  in CNF:
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨  b^{1, 740}_2
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨  b^{1, 740}_1
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨  p_739 ∨ -b^{1, 740}_0
c  in DIMACS:
-3377  3378 -3379  739  3380 0
-3377  3378 -3379  739  3381 0
-3377  3378 -3379  739 -3382 0

c  -2-1 --> break 
c    ( b^{1, 739}_2 ∧  b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧ -p_739) -> break
c  in CNF:
c    -b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨  b^{1, 739}_0 ∨  p_739 ∨ break
c  in DIMACS:
-3377 -3378  3379  739 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 739}_2 ∧ -b^{1, 739}_1 ∧ -b^{1, 739}_0 ∧ true) 
c  in CNF:
c    -b^{1, 739}_2 ∨  b^{1, 739}_1 ∨  b^{1, 739}_0 ∨ false 
c  in DIMACS:
-3377  3378  3379  0

c  3 does not represent an automaton state.
c    -(-b^{1, 739}_2 ∧  b^{1, 739}_1 ∧  b^{1, 739}_0 ∧ true) 
c  in CNF:
c     b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ false 
c  in DIMACS:
 3377 -3378 -3379  0
c  -3 does not represent an automaton state.
c    -( b^{1, 739}_2 ∧  b^{1, 739}_1 ∧  b^{1, 739}_0 ∧ true) 
c  in CNF:
c    -b^{1, 739}_2 ∨ -b^{1, 739}_1 ∨ -b^{1, 739}_0 ∨ false 
c  in DIMACS:
-3377 -3378 -3379  0

c i = 740
c  -2+1 --> -1
c    ( b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧  p_740) -> ( b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0)
c  in CNF:
c    -b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨  b^{1, 741}_2
c    -b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_1
c    -b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨  b^{1, 741}_0
c  in DIMACS:
-3380 -3381  3382 -740  3383 0
-3380 -3381  3382 -740 -3384 0
-3380 -3381  3382 -740  3385 0

c  -1+1 --> 0
c    ( b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0 ∧  p_740) -> (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧ -b^{1, 741}_0)
c  in CNF:
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_2
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_1
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_0
c  in DIMACS:
-3380  3381 -3382 -740 -3383 0
-3380  3381 -3382 -740 -3384 0
-3380  3381 -3382 -740 -3385 0

c  0+1 --> 1
c    (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧  p_740) -> (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0)
c  in CNF:
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_2
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_1
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨  b^{1, 741}_0
c  in DIMACS:
 3380  3381  3382 -740 -3383 0
 3380  3381  3382 -740 -3384 0
 3380  3381  3382 -740  3385 0

c  1+1 --> 2
c    (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0 ∧  p_740) -> (-b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0)
c  in CNF:
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_2
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨  b^{1, 741}_1
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ -p_740 ∨ -b^{1, 741}_0
c  in DIMACS:
 3380  3381 -3382 -740 -3383 0
 3380  3381 -3382 -740  3384 0
 3380  3381 -3382 -740 -3385 0

c  2+1 --> break 
c    (-b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧  p_740) -> break
c  in CNF:
c     b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 3380 -3381  3382 -740 1162 0


c  2-1 --> 1
c    (-b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧ -p_740) -> (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0)
c  in CNF:
c     b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_2
c     b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_1
c     b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨  b^{1, 741}_0
c  in DIMACS:
 3380 -3381  3382  740 -3383 0
 3380 -3381  3382  740 -3384 0
 3380 -3381  3382  740  3385 0

c  1-1 --> 0
c    (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0 ∧ -p_740) -> (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧ -b^{1, 741}_0)
c  in CNF:
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_2
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_1
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_0
c  in DIMACS:
 3380  3381 -3382  740 -3383 0
 3380  3381 -3382  740 -3384 0
 3380  3381 -3382  740 -3385 0

c  0-1 --> -1
c    (-b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧ -p_740) -> ( b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0)
c  in CNF:
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨  b^{1, 741}_2
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_1
c     b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨  b^{1, 741}_0
c  in DIMACS:
 3380  3381  3382  740  3383 0
 3380  3381  3382  740 -3384 0
 3380  3381  3382  740  3385 0

c  -1-1 --> -2
c    ( b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧  b^{1, 740}_0 ∧ -p_740) -> ( b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0)
c  in CNF:
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨  b^{1, 741}_2
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨  b^{1, 741}_1
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨  p_740 ∨ -b^{1, 741}_0
c  in DIMACS:
-3380  3381 -3382  740  3383 0
-3380  3381 -3382  740  3384 0
-3380  3381 -3382  740 -3385 0

c  -2-1 --> break 
c    ( b^{1, 740}_2 ∧  b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨  b^{1, 740}_0 ∨  p_740 ∨ break
c  in DIMACS:
-3380 -3381  3382  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 740}_2 ∧ -b^{1, 740}_1 ∧ -b^{1, 740}_0 ∧ true) 
c  in CNF:
c    -b^{1, 740}_2 ∨  b^{1, 740}_1 ∨  b^{1, 740}_0 ∨ false 
c  in DIMACS:
-3380  3381  3382  0

c  3 does not represent an automaton state.
c    -(-b^{1, 740}_2 ∧  b^{1, 740}_1 ∧  b^{1, 740}_0 ∧ true) 
c  in CNF:
c     b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ false 
c  in DIMACS:
 3380 -3381 -3382  0
c  -3 does not represent an automaton state.
c    -( b^{1, 740}_2 ∧  b^{1, 740}_1 ∧  b^{1, 740}_0 ∧ true) 
c  in CNF:
c    -b^{1, 740}_2 ∨ -b^{1, 740}_1 ∨ -b^{1, 740}_0 ∨ false 
c  in DIMACS:
-3380 -3381 -3382  0

c i = 741
c  -2+1 --> -1
c    ( b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧  p_741) -> ( b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0)
c  in CNF:
c    -b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨  b^{1, 742}_2
c    -b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_1
c    -b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨  b^{1, 742}_0
c  in DIMACS:
-3383 -3384  3385 -741  3386 0
-3383 -3384  3385 -741 -3387 0
-3383 -3384  3385 -741  3388 0

c  -1+1 --> 0
c    ( b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0 ∧  p_741) -> (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧ -b^{1, 742}_0)
c  in CNF:
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_2
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_1
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_0
c  in DIMACS:
-3383  3384 -3385 -741 -3386 0
-3383  3384 -3385 -741 -3387 0
-3383  3384 -3385 -741 -3388 0

c  0+1 --> 1
c    (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧  p_741) -> (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0)
c  in CNF:
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_2
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_1
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨  b^{1, 742}_0
c  in DIMACS:
 3383  3384  3385 -741 -3386 0
 3383  3384  3385 -741 -3387 0
 3383  3384  3385 -741  3388 0

c  1+1 --> 2
c    (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0 ∧  p_741) -> (-b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0)
c  in CNF:
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_2
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨  b^{1, 742}_1
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ -p_741 ∨ -b^{1, 742}_0
c  in DIMACS:
 3383  3384 -3385 -741 -3386 0
 3383  3384 -3385 -741  3387 0
 3383  3384 -3385 -741 -3388 0

c  2+1 --> break 
c    (-b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧  p_741) -> break
c  in CNF:
c     b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 3383 -3384  3385 -741 1162 0


c  2-1 --> 1
c    (-b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧ -p_741) -> (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0)
c  in CNF:
c     b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_2
c     b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_1
c     b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨  b^{1, 742}_0
c  in DIMACS:
 3383 -3384  3385  741 -3386 0
 3383 -3384  3385  741 -3387 0
 3383 -3384  3385  741  3388 0

c  1-1 --> 0
c    (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0 ∧ -p_741) -> (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧ -b^{1, 742}_0)
c  in CNF:
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_2
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_1
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_0
c  in DIMACS:
 3383  3384 -3385  741 -3386 0
 3383  3384 -3385  741 -3387 0
 3383  3384 -3385  741 -3388 0

c  0-1 --> -1
c    (-b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧ -p_741) -> ( b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0)
c  in CNF:
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨  b^{1, 742}_2
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_1
c     b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨  b^{1, 742}_0
c  in DIMACS:
 3383  3384  3385  741  3386 0
 3383  3384  3385  741 -3387 0
 3383  3384  3385  741  3388 0

c  -1-1 --> -2
c    ( b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧  b^{1, 741}_0 ∧ -p_741) -> ( b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0)
c  in CNF:
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨  b^{1, 742}_2
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨  b^{1, 742}_1
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨  p_741 ∨ -b^{1, 742}_0
c  in DIMACS:
-3383  3384 -3385  741  3386 0
-3383  3384 -3385  741  3387 0
-3383  3384 -3385  741 -3388 0

c  -2-1 --> break 
c    ( b^{1, 741}_2 ∧  b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨  b^{1, 741}_0 ∨  p_741 ∨ break
c  in DIMACS:
-3383 -3384  3385  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 741}_2 ∧ -b^{1, 741}_1 ∧ -b^{1, 741}_0 ∧ true) 
c  in CNF:
c    -b^{1, 741}_2 ∨  b^{1, 741}_1 ∨  b^{1, 741}_0 ∨ false 
c  in DIMACS:
-3383  3384  3385  0

c  3 does not represent an automaton state.
c    -(-b^{1, 741}_2 ∧  b^{1, 741}_1 ∧  b^{1, 741}_0 ∧ true) 
c  in CNF:
c     b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ false 
c  in DIMACS:
 3383 -3384 -3385  0
c  -3 does not represent an automaton state.
c    -( b^{1, 741}_2 ∧  b^{1, 741}_1 ∧  b^{1, 741}_0 ∧ true) 
c  in CNF:
c    -b^{1, 741}_2 ∨ -b^{1, 741}_1 ∨ -b^{1, 741}_0 ∨ false 
c  in DIMACS:
-3383 -3384 -3385  0

c i = 742
c  -2+1 --> -1
c    ( b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧  p_742) -> ( b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0)
c  in CNF:
c    -b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨  b^{1, 743}_2
c    -b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_1
c    -b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨  b^{1, 743}_0
c  in DIMACS:
-3386 -3387  3388 -742  3389 0
-3386 -3387  3388 -742 -3390 0
-3386 -3387  3388 -742  3391 0

c  -1+1 --> 0
c    ( b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0 ∧  p_742) -> (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧ -b^{1, 743}_0)
c  in CNF:
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_2
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_1
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_0
c  in DIMACS:
-3386  3387 -3388 -742 -3389 0
-3386  3387 -3388 -742 -3390 0
-3386  3387 -3388 -742 -3391 0

c  0+1 --> 1
c    (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧  p_742) -> (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0)
c  in CNF:
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_2
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_1
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨  b^{1, 743}_0
c  in DIMACS:
 3386  3387  3388 -742 -3389 0
 3386  3387  3388 -742 -3390 0
 3386  3387  3388 -742  3391 0

c  1+1 --> 2
c    (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0 ∧  p_742) -> (-b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0)
c  in CNF:
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_2
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨  b^{1, 743}_1
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ -p_742 ∨ -b^{1, 743}_0
c  in DIMACS:
 3386  3387 -3388 -742 -3389 0
 3386  3387 -3388 -742  3390 0
 3386  3387 -3388 -742 -3391 0

c  2+1 --> break 
c    (-b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧  p_742) -> break
c  in CNF:
c     b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 3386 -3387  3388 -742 1162 0


c  2-1 --> 1
c    (-b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧ -p_742) -> (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0)
c  in CNF:
c     b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_2
c     b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_1
c     b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨  b^{1, 743}_0
c  in DIMACS:
 3386 -3387  3388  742 -3389 0
 3386 -3387  3388  742 -3390 0
 3386 -3387  3388  742  3391 0

c  1-1 --> 0
c    (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0 ∧ -p_742) -> (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧ -b^{1, 743}_0)
c  in CNF:
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_2
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_1
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_0
c  in DIMACS:
 3386  3387 -3388  742 -3389 0
 3386  3387 -3388  742 -3390 0
 3386  3387 -3388  742 -3391 0

c  0-1 --> -1
c    (-b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧ -p_742) -> ( b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0)
c  in CNF:
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨  b^{1, 743}_2
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_1
c     b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨  b^{1, 743}_0
c  in DIMACS:
 3386  3387  3388  742  3389 0
 3386  3387  3388  742 -3390 0
 3386  3387  3388  742  3391 0

c  -1-1 --> -2
c    ( b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧  b^{1, 742}_0 ∧ -p_742) -> ( b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0)
c  in CNF:
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨  b^{1, 743}_2
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨  b^{1, 743}_1
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨  p_742 ∨ -b^{1, 743}_0
c  in DIMACS:
-3386  3387 -3388  742  3389 0
-3386  3387 -3388  742  3390 0
-3386  3387 -3388  742 -3391 0

c  -2-1 --> break 
c    ( b^{1, 742}_2 ∧  b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨  b^{1, 742}_0 ∨  p_742 ∨ break
c  in DIMACS:
-3386 -3387  3388  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 742}_2 ∧ -b^{1, 742}_1 ∧ -b^{1, 742}_0 ∧ true) 
c  in CNF:
c    -b^{1, 742}_2 ∨  b^{1, 742}_1 ∨  b^{1, 742}_0 ∨ false 
c  in DIMACS:
-3386  3387  3388  0

c  3 does not represent an automaton state.
c    -(-b^{1, 742}_2 ∧  b^{1, 742}_1 ∧  b^{1, 742}_0 ∧ true) 
c  in CNF:
c     b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ false 
c  in DIMACS:
 3386 -3387 -3388  0
c  -3 does not represent an automaton state.
c    -( b^{1, 742}_2 ∧  b^{1, 742}_1 ∧  b^{1, 742}_0 ∧ true) 
c  in CNF:
c    -b^{1, 742}_2 ∨ -b^{1, 742}_1 ∨ -b^{1, 742}_0 ∨ false 
c  in DIMACS:
-3386 -3387 -3388  0

c i = 743
c  -2+1 --> -1
c    ( b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧  p_743) -> ( b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0)
c  in CNF:
c    -b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨  b^{1, 744}_2
c    -b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_1
c    -b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨  b^{1, 744}_0
c  in DIMACS:
-3389 -3390  3391 -743  3392 0
-3389 -3390  3391 -743 -3393 0
-3389 -3390  3391 -743  3394 0

c  -1+1 --> 0
c    ( b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0 ∧  p_743) -> (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧ -b^{1, 744}_0)
c  in CNF:
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_2
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_1
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_0
c  in DIMACS:
-3389  3390 -3391 -743 -3392 0
-3389  3390 -3391 -743 -3393 0
-3389  3390 -3391 -743 -3394 0

c  0+1 --> 1
c    (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧  p_743) -> (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0)
c  in CNF:
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_2
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_1
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨  b^{1, 744}_0
c  in DIMACS:
 3389  3390  3391 -743 -3392 0
 3389  3390  3391 -743 -3393 0
 3389  3390  3391 -743  3394 0

c  1+1 --> 2
c    (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0 ∧  p_743) -> (-b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0)
c  in CNF:
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_2
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨  b^{1, 744}_1
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ -p_743 ∨ -b^{1, 744}_0
c  in DIMACS:
 3389  3390 -3391 -743 -3392 0
 3389  3390 -3391 -743  3393 0
 3389  3390 -3391 -743 -3394 0

c  2+1 --> break 
c    (-b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧  p_743) -> break
c  in CNF:
c     b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ -p_743 ∨ break
c  in DIMACS:
 3389 -3390  3391 -743 1162 0


c  2-1 --> 1
c    (-b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧ -p_743) -> (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0)
c  in CNF:
c     b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_2
c     b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_1
c     b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨  b^{1, 744}_0
c  in DIMACS:
 3389 -3390  3391  743 -3392 0
 3389 -3390  3391  743 -3393 0
 3389 -3390  3391  743  3394 0

c  1-1 --> 0
c    (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0 ∧ -p_743) -> (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧ -b^{1, 744}_0)
c  in CNF:
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_2
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_1
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_0
c  in DIMACS:
 3389  3390 -3391  743 -3392 0
 3389  3390 -3391  743 -3393 0
 3389  3390 -3391  743 -3394 0

c  0-1 --> -1
c    (-b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧ -p_743) -> ( b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0)
c  in CNF:
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨  b^{1, 744}_2
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_1
c     b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨  b^{1, 744}_0
c  in DIMACS:
 3389  3390  3391  743  3392 0
 3389  3390  3391  743 -3393 0
 3389  3390  3391  743  3394 0

c  -1-1 --> -2
c    ( b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧  b^{1, 743}_0 ∧ -p_743) -> ( b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0)
c  in CNF:
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨  b^{1, 744}_2
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨  b^{1, 744}_1
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨  p_743 ∨ -b^{1, 744}_0
c  in DIMACS:
-3389  3390 -3391  743  3392 0
-3389  3390 -3391  743  3393 0
-3389  3390 -3391  743 -3394 0

c  -2-1 --> break 
c    ( b^{1, 743}_2 ∧  b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧ -p_743) -> break
c  in CNF:
c    -b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨  b^{1, 743}_0 ∨  p_743 ∨ break
c  in DIMACS:
-3389 -3390  3391  743 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 743}_2 ∧ -b^{1, 743}_1 ∧ -b^{1, 743}_0 ∧ true) 
c  in CNF:
c    -b^{1, 743}_2 ∨  b^{1, 743}_1 ∨  b^{1, 743}_0 ∨ false 
c  in DIMACS:
-3389  3390  3391  0

c  3 does not represent an automaton state.
c    -(-b^{1, 743}_2 ∧  b^{1, 743}_1 ∧  b^{1, 743}_0 ∧ true) 
c  in CNF:
c     b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ false 
c  in DIMACS:
 3389 -3390 -3391  0
c  -3 does not represent an automaton state.
c    -( b^{1, 743}_2 ∧  b^{1, 743}_1 ∧  b^{1, 743}_0 ∧ true) 
c  in CNF:
c    -b^{1, 743}_2 ∨ -b^{1, 743}_1 ∨ -b^{1, 743}_0 ∨ false 
c  in DIMACS:
-3389 -3390 -3391  0

c i = 744
c  -2+1 --> -1
c    ( b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧  p_744) -> ( b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0)
c  in CNF:
c    -b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨  b^{1, 745}_2
c    -b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_1
c    -b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨  b^{1, 745}_0
c  in DIMACS:
-3392 -3393  3394 -744  3395 0
-3392 -3393  3394 -744 -3396 0
-3392 -3393  3394 -744  3397 0

c  -1+1 --> 0
c    ( b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0 ∧  p_744) -> (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧ -b^{1, 745}_0)
c  in CNF:
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_2
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_1
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_0
c  in DIMACS:
-3392  3393 -3394 -744 -3395 0
-3392  3393 -3394 -744 -3396 0
-3392  3393 -3394 -744 -3397 0

c  0+1 --> 1
c    (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧  p_744) -> (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0)
c  in CNF:
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_2
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_1
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨  b^{1, 745}_0
c  in DIMACS:
 3392  3393  3394 -744 -3395 0
 3392  3393  3394 -744 -3396 0
 3392  3393  3394 -744  3397 0

c  1+1 --> 2
c    (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0 ∧  p_744) -> (-b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0)
c  in CNF:
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_2
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨  b^{1, 745}_1
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ -p_744 ∨ -b^{1, 745}_0
c  in DIMACS:
 3392  3393 -3394 -744 -3395 0
 3392  3393 -3394 -744  3396 0
 3392  3393 -3394 -744 -3397 0

c  2+1 --> break 
c    (-b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧  p_744) -> break
c  in CNF:
c     b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 3392 -3393  3394 -744 1162 0


c  2-1 --> 1
c    (-b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧ -p_744) -> (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0)
c  in CNF:
c     b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_2
c     b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_1
c     b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨  b^{1, 745}_0
c  in DIMACS:
 3392 -3393  3394  744 -3395 0
 3392 -3393  3394  744 -3396 0
 3392 -3393  3394  744  3397 0

c  1-1 --> 0
c    (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0 ∧ -p_744) -> (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧ -b^{1, 745}_0)
c  in CNF:
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_2
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_1
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_0
c  in DIMACS:
 3392  3393 -3394  744 -3395 0
 3392  3393 -3394  744 -3396 0
 3392  3393 -3394  744 -3397 0

c  0-1 --> -1
c    (-b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧ -p_744) -> ( b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0)
c  in CNF:
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨  b^{1, 745}_2
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_1
c     b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨  b^{1, 745}_0
c  in DIMACS:
 3392  3393  3394  744  3395 0
 3392  3393  3394  744 -3396 0
 3392  3393  3394  744  3397 0

c  -1-1 --> -2
c    ( b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧  b^{1, 744}_0 ∧ -p_744) -> ( b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0)
c  in CNF:
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨  b^{1, 745}_2
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨  b^{1, 745}_1
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨  p_744 ∨ -b^{1, 745}_0
c  in DIMACS:
-3392  3393 -3394  744  3395 0
-3392  3393 -3394  744  3396 0
-3392  3393 -3394  744 -3397 0

c  -2-1 --> break 
c    ( b^{1, 744}_2 ∧  b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨  b^{1, 744}_0 ∨  p_744 ∨ break
c  in DIMACS:
-3392 -3393  3394  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 744}_2 ∧ -b^{1, 744}_1 ∧ -b^{1, 744}_0 ∧ true) 
c  in CNF:
c    -b^{1, 744}_2 ∨  b^{1, 744}_1 ∨  b^{1, 744}_0 ∨ false 
c  in DIMACS:
-3392  3393  3394  0

c  3 does not represent an automaton state.
c    -(-b^{1, 744}_2 ∧  b^{1, 744}_1 ∧  b^{1, 744}_0 ∧ true) 
c  in CNF:
c     b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ false 
c  in DIMACS:
 3392 -3393 -3394  0
c  -3 does not represent an automaton state.
c    -( b^{1, 744}_2 ∧  b^{1, 744}_1 ∧  b^{1, 744}_0 ∧ true) 
c  in CNF:
c    -b^{1, 744}_2 ∨ -b^{1, 744}_1 ∨ -b^{1, 744}_0 ∨ false 
c  in DIMACS:
-3392 -3393 -3394  0

c i = 745
c  -2+1 --> -1
c    ( b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧  p_745) -> ( b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0)
c  in CNF:
c    -b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨  b^{1, 746}_2
c    -b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_1
c    -b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨  b^{1, 746}_0
c  in DIMACS:
-3395 -3396  3397 -745  3398 0
-3395 -3396  3397 -745 -3399 0
-3395 -3396  3397 -745  3400 0

c  -1+1 --> 0
c    ( b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0 ∧  p_745) -> (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧ -b^{1, 746}_0)
c  in CNF:
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_2
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_1
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_0
c  in DIMACS:
-3395  3396 -3397 -745 -3398 0
-3395  3396 -3397 -745 -3399 0
-3395  3396 -3397 -745 -3400 0

c  0+1 --> 1
c    (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧  p_745) -> (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0)
c  in CNF:
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_2
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_1
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨  b^{1, 746}_0
c  in DIMACS:
 3395  3396  3397 -745 -3398 0
 3395  3396  3397 -745 -3399 0
 3395  3396  3397 -745  3400 0

c  1+1 --> 2
c    (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0 ∧  p_745) -> (-b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0)
c  in CNF:
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_2
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨  b^{1, 746}_1
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ -p_745 ∨ -b^{1, 746}_0
c  in DIMACS:
 3395  3396 -3397 -745 -3398 0
 3395  3396 -3397 -745  3399 0
 3395  3396 -3397 -745 -3400 0

c  2+1 --> break 
c    (-b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧  p_745) -> break
c  in CNF:
c     b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ -p_745 ∨ break
c  in DIMACS:
 3395 -3396  3397 -745 1162 0


c  2-1 --> 1
c    (-b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧ -p_745) -> (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0)
c  in CNF:
c     b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_2
c     b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_1
c     b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨  b^{1, 746}_0
c  in DIMACS:
 3395 -3396  3397  745 -3398 0
 3395 -3396  3397  745 -3399 0
 3395 -3396  3397  745  3400 0

c  1-1 --> 0
c    (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0 ∧ -p_745) -> (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧ -b^{1, 746}_0)
c  in CNF:
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_2
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_1
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_0
c  in DIMACS:
 3395  3396 -3397  745 -3398 0
 3395  3396 -3397  745 -3399 0
 3395  3396 -3397  745 -3400 0

c  0-1 --> -1
c    (-b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧ -p_745) -> ( b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0)
c  in CNF:
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨  b^{1, 746}_2
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_1
c     b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨  b^{1, 746}_0
c  in DIMACS:
 3395  3396  3397  745  3398 0
 3395  3396  3397  745 -3399 0
 3395  3396  3397  745  3400 0

c  -1-1 --> -2
c    ( b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧  b^{1, 745}_0 ∧ -p_745) -> ( b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0)
c  in CNF:
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨  b^{1, 746}_2
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨  b^{1, 746}_1
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨  p_745 ∨ -b^{1, 746}_0
c  in DIMACS:
-3395  3396 -3397  745  3398 0
-3395  3396 -3397  745  3399 0
-3395  3396 -3397  745 -3400 0

c  -2-1 --> break 
c    ( b^{1, 745}_2 ∧  b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧ -p_745) -> break
c  in CNF:
c    -b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨  b^{1, 745}_0 ∨  p_745 ∨ break
c  in DIMACS:
-3395 -3396  3397  745 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 745}_2 ∧ -b^{1, 745}_1 ∧ -b^{1, 745}_0 ∧ true) 
c  in CNF:
c    -b^{1, 745}_2 ∨  b^{1, 745}_1 ∨  b^{1, 745}_0 ∨ false 
c  in DIMACS:
-3395  3396  3397  0

c  3 does not represent an automaton state.
c    -(-b^{1, 745}_2 ∧  b^{1, 745}_1 ∧  b^{1, 745}_0 ∧ true) 
c  in CNF:
c     b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ false 
c  in DIMACS:
 3395 -3396 -3397  0
c  -3 does not represent an automaton state.
c    -( b^{1, 745}_2 ∧  b^{1, 745}_1 ∧  b^{1, 745}_0 ∧ true) 
c  in CNF:
c    -b^{1, 745}_2 ∨ -b^{1, 745}_1 ∨ -b^{1, 745}_0 ∨ false 
c  in DIMACS:
-3395 -3396 -3397  0

c i = 746
c  -2+1 --> -1
c    ( b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧  p_746) -> ( b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0)
c  in CNF:
c    -b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨  b^{1, 747}_2
c    -b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_1
c    -b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨  b^{1, 747}_0
c  in DIMACS:
-3398 -3399  3400 -746  3401 0
-3398 -3399  3400 -746 -3402 0
-3398 -3399  3400 -746  3403 0

c  -1+1 --> 0
c    ( b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0 ∧  p_746) -> (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧ -b^{1, 747}_0)
c  in CNF:
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_2
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_1
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_0
c  in DIMACS:
-3398  3399 -3400 -746 -3401 0
-3398  3399 -3400 -746 -3402 0
-3398  3399 -3400 -746 -3403 0

c  0+1 --> 1
c    (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧  p_746) -> (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0)
c  in CNF:
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_2
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_1
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨  b^{1, 747}_0
c  in DIMACS:
 3398  3399  3400 -746 -3401 0
 3398  3399  3400 -746 -3402 0
 3398  3399  3400 -746  3403 0

c  1+1 --> 2
c    (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0 ∧  p_746) -> (-b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0)
c  in CNF:
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_2
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨  b^{1, 747}_1
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ -p_746 ∨ -b^{1, 747}_0
c  in DIMACS:
 3398  3399 -3400 -746 -3401 0
 3398  3399 -3400 -746  3402 0
 3398  3399 -3400 -746 -3403 0

c  2+1 --> break 
c    (-b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧  p_746) -> break
c  in CNF:
c     b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ -p_746 ∨ break
c  in DIMACS:
 3398 -3399  3400 -746 1162 0


c  2-1 --> 1
c    (-b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧ -p_746) -> (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0)
c  in CNF:
c     b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_2
c     b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_1
c     b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨  b^{1, 747}_0
c  in DIMACS:
 3398 -3399  3400  746 -3401 0
 3398 -3399  3400  746 -3402 0
 3398 -3399  3400  746  3403 0

c  1-1 --> 0
c    (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0 ∧ -p_746) -> (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧ -b^{1, 747}_0)
c  in CNF:
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_2
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_1
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_0
c  in DIMACS:
 3398  3399 -3400  746 -3401 0
 3398  3399 -3400  746 -3402 0
 3398  3399 -3400  746 -3403 0

c  0-1 --> -1
c    (-b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧ -p_746) -> ( b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0)
c  in CNF:
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨  b^{1, 747}_2
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_1
c     b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨  b^{1, 747}_0
c  in DIMACS:
 3398  3399  3400  746  3401 0
 3398  3399  3400  746 -3402 0
 3398  3399  3400  746  3403 0

c  -1-1 --> -2
c    ( b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧  b^{1, 746}_0 ∧ -p_746) -> ( b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0)
c  in CNF:
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨  b^{1, 747}_2
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨  b^{1, 747}_1
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨  p_746 ∨ -b^{1, 747}_0
c  in DIMACS:
-3398  3399 -3400  746  3401 0
-3398  3399 -3400  746  3402 0
-3398  3399 -3400  746 -3403 0

c  -2-1 --> break 
c    ( b^{1, 746}_2 ∧  b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧ -p_746) -> break
c  in CNF:
c    -b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨  b^{1, 746}_0 ∨  p_746 ∨ break
c  in DIMACS:
-3398 -3399  3400  746 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 746}_2 ∧ -b^{1, 746}_1 ∧ -b^{1, 746}_0 ∧ true) 
c  in CNF:
c    -b^{1, 746}_2 ∨  b^{1, 746}_1 ∨  b^{1, 746}_0 ∨ false 
c  in DIMACS:
-3398  3399  3400  0

c  3 does not represent an automaton state.
c    -(-b^{1, 746}_2 ∧  b^{1, 746}_1 ∧  b^{1, 746}_0 ∧ true) 
c  in CNF:
c     b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ false 
c  in DIMACS:
 3398 -3399 -3400  0
c  -3 does not represent an automaton state.
c    -( b^{1, 746}_2 ∧  b^{1, 746}_1 ∧  b^{1, 746}_0 ∧ true) 
c  in CNF:
c    -b^{1, 746}_2 ∨ -b^{1, 746}_1 ∨ -b^{1, 746}_0 ∨ false 
c  in DIMACS:
-3398 -3399 -3400  0

c i = 747
c  -2+1 --> -1
c    ( b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧  p_747) -> ( b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0)
c  in CNF:
c    -b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨  b^{1, 748}_2
c    -b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_1
c    -b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨  b^{1, 748}_0
c  in DIMACS:
-3401 -3402  3403 -747  3404 0
-3401 -3402  3403 -747 -3405 0
-3401 -3402  3403 -747  3406 0

c  -1+1 --> 0
c    ( b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0 ∧  p_747) -> (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧ -b^{1, 748}_0)
c  in CNF:
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_2
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_1
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_0
c  in DIMACS:
-3401  3402 -3403 -747 -3404 0
-3401  3402 -3403 -747 -3405 0
-3401  3402 -3403 -747 -3406 0

c  0+1 --> 1
c    (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧  p_747) -> (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0)
c  in CNF:
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_2
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_1
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨  b^{1, 748}_0
c  in DIMACS:
 3401  3402  3403 -747 -3404 0
 3401  3402  3403 -747 -3405 0
 3401  3402  3403 -747  3406 0

c  1+1 --> 2
c    (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0 ∧  p_747) -> (-b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0)
c  in CNF:
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_2
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨  b^{1, 748}_1
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ -p_747 ∨ -b^{1, 748}_0
c  in DIMACS:
 3401  3402 -3403 -747 -3404 0
 3401  3402 -3403 -747  3405 0
 3401  3402 -3403 -747 -3406 0

c  2+1 --> break 
c    (-b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧  p_747) -> break
c  in CNF:
c     b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ -p_747 ∨ break
c  in DIMACS:
 3401 -3402  3403 -747 1162 0


c  2-1 --> 1
c    (-b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧ -p_747) -> (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0)
c  in CNF:
c     b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_2
c     b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_1
c     b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨  b^{1, 748}_0
c  in DIMACS:
 3401 -3402  3403  747 -3404 0
 3401 -3402  3403  747 -3405 0
 3401 -3402  3403  747  3406 0

c  1-1 --> 0
c    (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0 ∧ -p_747) -> (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧ -b^{1, 748}_0)
c  in CNF:
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_2
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_1
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_0
c  in DIMACS:
 3401  3402 -3403  747 -3404 0
 3401  3402 -3403  747 -3405 0
 3401  3402 -3403  747 -3406 0

c  0-1 --> -1
c    (-b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧ -p_747) -> ( b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0)
c  in CNF:
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨  b^{1, 748}_2
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_1
c     b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨  b^{1, 748}_0
c  in DIMACS:
 3401  3402  3403  747  3404 0
 3401  3402  3403  747 -3405 0
 3401  3402  3403  747  3406 0

c  -1-1 --> -2
c    ( b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧  b^{1, 747}_0 ∧ -p_747) -> ( b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0)
c  in CNF:
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨  b^{1, 748}_2
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨  b^{1, 748}_1
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨  p_747 ∨ -b^{1, 748}_0
c  in DIMACS:
-3401  3402 -3403  747  3404 0
-3401  3402 -3403  747  3405 0
-3401  3402 -3403  747 -3406 0

c  -2-1 --> break 
c    ( b^{1, 747}_2 ∧  b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧ -p_747) -> break
c  in CNF:
c    -b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨  b^{1, 747}_0 ∨  p_747 ∨ break
c  in DIMACS:
-3401 -3402  3403  747 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 747}_2 ∧ -b^{1, 747}_1 ∧ -b^{1, 747}_0 ∧ true) 
c  in CNF:
c    -b^{1, 747}_2 ∨  b^{1, 747}_1 ∨  b^{1, 747}_0 ∨ false 
c  in DIMACS:
-3401  3402  3403  0

c  3 does not represent an automaton state.
c    -(-b^{1, 747}_2 ∧  b^{1, 747}_1 ∧  b^{1, 747}_0 ∧ true) 
c  in CNF:
c     b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ false 
c  in DIMACS:
 3401 -3402 -3403  0
c  -3 does not represent an automaton state.
c    -( b^{1, 747}_2 ∧  b^{1, 747}_1 ∧  b^{1, 747}_0 ∧ true) 
c  in CNF:
c    -b^{1, 747}_2 ∨ -b^{1, 747}_1 ∨ -b^{1, 747}_0 ∨ false 
c  in DIMACS:
-3401 -3402 -3403  0

c i = 748
c  -2+1 --> -1
c    ( b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧  p_748) -> ( b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0)
c  in CNF:
c    -b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨  b^{1, 749}_2
c    -b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_1
c    -b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨  b^{1, 749}_0
c  in DIMACS:
-3404 -3405  3406 -748  3407 0
-3404 -3405  3406 -748 -3408 0
-3404 -3405  3406 -748  3409 0

c  -1+1 --> 0
c    ( b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0 ∧  p_748) -> (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧ -b^{1, 749}_0)
c  in CNF:
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_2
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_1
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_0
c  in DIMACS:
-3404  3405 -3406 -748 -3407 0
-3404  3405 -3406 -748 -3408 0
-3404  3405 -3406 -748 -3409 0

c  0+1 --> 1
c    (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧  p_748) -> (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0)
c  in CNF:
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_2
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_1
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨  b^{1, 749}_0
c  in DIMACS:
 3404  3405  3406 -748 -3407 0
 3404  3405  3406 -748 -3408 0
 3404  3405  3406 -748  3409 0

c  1+1 --> 2
c    (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0 ∧  p_748) -> (-b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0)
c  in CNF:
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_2
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨  b^{1, 749}_1
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ -p_748 ∨ -b^{1, 749}_0
c  in DIMACS:
 3404  3405 -3406 -748 -3407 0
 3404  3405 -3406 -748  3408 0
 3404  3405 -3406 -748 -3409 0

c  2+1 --> break 
c    (-b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧  p_748) -> break
c  in CNF:
c     b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 3404 -3405  3406 -748 1162 0


c  2-1 --> 1
c    (-b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧ -p_748) -> (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0)
c  in CNF:
c     b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_2
c     b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_1
c     b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨  b^{1, 749}_0
c  in DIMACS:
 3404 -3405  3406  748 -3407 0
 3404 -3405  3406  748 -3408 0
 3404 -3405  3406  748  3409 0

c  1-1 --> 0
c    (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0 ∧ -p_748) -> (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧ -b^{1, 749}_0)
c  in CNF:
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_2
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_1
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_0
c  in DIMACS:
 3404  3405 -3406  748 -3407 0
 3404  3405 -3406  748 -3408 0
 3404  3405 -3406  748 -3409 0

c  0-1 --> -1
c    (-b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧ -p_748) -> ( b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0)
c  in CNF:
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨  b^{1, 749}_2
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_1
c     b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨  b^{1, 749}_0
c  in DIMACS:
 3404  3405  3406  748  3407 0
 3404  3405  3406  748 -3408 0
 3404  3405  3406  748  3409 0

c  -1-1 --> -2
c    ( b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧  b^{1, 748}_0 ∧ -p_748) -> ( b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0)
c  in CNF:
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨  b^{1, 749}_2
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨  b^{1, 749}_1
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨  p_748 ∨ -b^{1, 749}_0
c  in DIMACS:
-3404  3405 -3406  748  3407 0
-3404  3405 -3406  748  3408 0
-3404  3405 -3406  748 -3409 0

c  -2-1 --> break 
c    ( b^{1, 748}_2 ∧  b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨  b^{1, 748}_0 ∨  p_748 ∨ break
c  in DIMACS:
-3404 -3405  3406  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 748}_2 ∧ -b^{1, 748}_1 ∧ -b^{1, 748}_0 ∧ true) 
c  in CNF:
c    -b^{1, 748}_2 ∨  b^{1, 748}_1 ∨  b^{1, 748}_0 ∨ false 
c  in DIMACS:
-3404  3405  3406  0

c  3 does not represent an automaton state.
c    -(-b^{1, 748}_2 ∧  b^{1, 748}_1 ∧  b^{1, 748}_0 ∧ true) 
c  in CNF:
c     b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ false 
c  in DIMACS:
 3404 -3405 -3406  0
c  -3 does not represent an automaton state.
c    -( b^{1, 748}_2 ∧  b^{1, 748}_1 ∧  b^{1, 748}_0 ∧ true) 
c  in CNF:
c    -b^{1, 748}_2 ∨ -b^{1, 748}_1 ∨ -b^{1, 748}_0 ∨ false 
c  in DIMACS:
-3404 -3405 -3406  0

c i = 749
c  -2+1 --> -1
c    ( b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧  p_749) -> ( b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0)
c  in CNF:
c    -b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨  b^{1, 750}_2
c    -b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_1
c    -b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨  b^{1, 750}_0
c  in DIMACS:
-3407 -3408  3409 -749  3410 0
-3407 -3408  3409 -749 -3411 0
-3407 -3408  3409 -749  3412 0

c  -1+1 --> 0
c    ( b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0 ∧  p_749) -> (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧ -b^{1, 750}_0)
c  in CNF:
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_2
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_1
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_0
c  in DIMACS:
-3407  3408 -3409 -749 -3410 0
-3407  3408 -3409 -749 -3411 0
-3407  3408 -3409 -749 -3412 0

c  0+1 --> 1
c    (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧  p_749) -> (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0)
c  in CNF:
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_2
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_1
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨  b^{1, 750}_0
c  in DIMACS:
 3407  3408  3409 -749 -3410 0
 3407  3408  3409 -749 -3411 0
 3407  3408  3409 -749  3412 0

c  1+1 --> 2
c    (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0 ∧  p_749) -> (-b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0)
c  in CNF:
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_2
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨  b^{1, 750}_1
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ -p_749 ∨ -b^{1, 750}_0
c  in DIMACS:
 3407  3408 -3409 -749 -3410 0
 3407  3408 -3409 -749  3411 0
 3407  3408 -3409 -749 -3412 0

c  2+1 --> break 
c    (-b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧  p_749) -> break
c  in CNF:
c     b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ -p_749 ∨ break
c  in DIMACS:
 3407 -3408  3409 -749 1162 0


c  2-1 --> 1
c    (-b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧ -p_749) -> (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0)
c  in CNF:
c     b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_2
c     b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_1
c     b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨  b^{1, 750}_0
c  in DIMACS:
 3407 -3408  3409  749 -3410 0
 3407 -3408  3409  749 -3411 0
 3407 -3408  3409  749  3412 0

c  1-1 --> 0
c    (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0 ∧ -p_749) -> (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧ -b^{1, 750}_0)
c  in CNF:
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_2
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_1
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_0
c  in DIMACS:
 3407  3408 -3409  749 -3410 0
 3407  3408 -3409  749 -3411 0
 3407  3408 -3409  749 -3412 0

c  0-1 --> -1
c    (-b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧ -p_749) -> ( b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0)
c  in CNF:
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨  b^{1, 750}_2
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_1
c     b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨  b^{1, 750}_0
c  in DIMACS:
 3407  3408  3409  749  3410 0
 3407  3408  3409  749 -3411 0
 3407  3408  3409  749  3412 0

c  -1-1 --> -2
c    ( b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧  b^{1, 749}_0 ∧ -p_749) -> ( b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0)
c  in CNF:
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨  b^{1, 750}_2
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨  b^{1, 750}_1
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨  p_749 ∨ -b^{1, 750}_0
c  in DIMACS:
-3407  3408 -3409  749  3410 0
-3407  3408 -3409  749  3411 0
-3407  3408 -3409  749 -3412 0

c  -2-1 --> break 
c    ( b^{1, 749}_2 ∧  b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧ -p_749) -> break
c  in CNF:
c    -b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨  b^{1, 749}_0 ∨  p_749 ∨ break
c  in DIMACS:
-3407 -3408  3409  749 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 749}_2 ∧ -b^{1, 749}_1 ∧ -b^{1, 749}_0 ∧ true) 
c  in CNF:
c    -b^{1, 749}_2 ∨  b^{1, 749}_1 ∨  b^{1, 749}_0 ∨ false 
c  in DIMACS:
-3407  3408  3409  0

c  3 does not represent an automaton state.
c    -(-b^{1, 749}_2 ∧  b^{1, 749}_1 ∧  b^{1, 749}_0 ∧ true) 
c  in CNF:
c     b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ false 
c  in DIMACS:
 3407 -3408 -3409  0
c  -3 does not represent an automaton state.
c    -( b^{1, 749}_2 ∧  b^{1, 749}_1 ∧  b^{1, 749}_0 ∧ true) 
c  in CNF:
c    -b^{1, 749}_2 ∨ -b^{1, 749}_1 ∨ -b^{1, 749}_0 ∨ false 
c  in DIMACS:
-3407 -3408 -3409  0

c i = 750
c  -2+1 --> -1
c    ( b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧  p_750) -> ( b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0)
c  in CNF:
c    -b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨  b^{1, 751}_2
c    -b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_1
c    -b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨  b^{1, 751}_0
c  in DIMACS:
-3410 -3411  3412 -750  3413 0
-3410 -3411  3412 -750 -3414 0
-3410 -3411  3412 -750  3415 0

c  -1+1 --> 0
c    ( b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0 ∧  p_750) -> (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧ -b^{1, 751}_0)
c  in CNF:
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_2
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_1
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_0
c  in DIMACS:
-3410  3411 -3412 -750 -3413 0
-3410  3411 -3412 -750 -3414 0
-3410  3411 -3412 -750 -3415 0

c  0+1 --> 1
c    (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧  p_750) -> (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0)
c  in CNF:
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_2
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_1
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨  b^{1, 751}_0
c  in DIMACS:
 3410  3411  3412 -750 -3413 0
 3410  3411  3412 -750 -3414 0
 3410  3411  3412 -750  3415 0

c  1+1 --> 2
c    (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0 ∧  p_750) -> (-b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0)
c  in CNF:
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_2
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨  b^{1, 751}_1
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ -p_750 ∨ -b^{1, 751}_0
c  in DIMACS:
 3410  3411 -3412 -750 -3413 0
 3410  3411 -3412 -750  3414 0
 3410  3411 -3412 -750 -3415 0

c  2+1 --> break 
c    (-b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧  p_750) -> break
c  in CNF:
c     b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 3410 -3411  3412 -750 1162 0


c  2-1 --> 1
c    (-b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧ -p_750) -> (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0)
c  in CNF:
c     b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_2
c     b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_1
c     b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨  b^{1, 751}_0
c  in DIMACS:
 3410 -3411  3412  750 -3413 0
 3410 -3411  3412  750 -3414 0
 3410 -3411  3412  750  3415 0

c  1-1 --> 0
c    (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0 ∧ -p_750) -> (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧ -b^{1, 751}_0)
c  in CNF:
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_2
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_1
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_0
c  in DIMACS:
 3410  3411 -3412  750 -3413 0
 3410  3411 -3412  750 -3414 0
 3410  3411 -3412  750 -3415 0

c  0-1 --> -1
c    (-b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧ -p_750) -> ( b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0)
c  in CNF:
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨  b^{1, 751}_2
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_1
c     b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨  b^{1, 751}_0
c  in DIMACS:
 3410  3411  3412  750  3413 0
 3410  3411  3412  750 -3414 0
 3410  3411  3412  750  3415 0

c  -1-1 --> -2
c    ( b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧  b^{1, 750}_0 ∧ -p_750) -> ( b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0)
c  in CNF:
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨  b^{1, 751}_2
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨  b^{1, 751}_1
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨  p_750 ∨ -b^{1, 751}_0
c  in DIMACS:
-3410  3411 -3412  750  3413 0
-3410  3411 -3412  750  3414 0
-3410  3411 -3412  750 -3415 0

c  -2-1 --> break 
c    ( b^{1, 750}_2 ∧  b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨  b^{1, 750}_0 ∨  p_750 ∨ break
c  in DIMACS:
-3410 -3411  3412  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 750}_2 ∧ -b^{1, 750}_1 ∧ -b^{1, 750}_0 ∧ true) 
c  in CNF:
c    -b^{1, 750}_2 ∨  b^{1, 750}_1 ∨  b^{1, 750}_0 ∨ false 
c  in DIMACS:
-3410  3411  3412  0

c  3 does not represent an automaton state.
c    -(-b^{1, 750}_2 ∧  b^{1, 750}_1 ∧  b^{1, 750}_0 ∧ true) 
c  in CNF:
c     b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ false 
c  in DIMACS:
 3410 -3411 -3412  0
c  -3 does not represent an automaton state.
c    -( b^{1, 750}_2 ∧  b^{1, 750}_1 ∧  b^{1, 750}_0 ∧ true) 
c  in CNF:
c    -b^{1, 750}_2 ∨ -b^{1, 750}_1 ∨ -b^{1, 750}_0 ∨ false 
c  in DIMACS:
-3410 -3411 -3412  0

c i = 751
c  -2+1 --> -1
c    ( b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧  p_751) -> ( b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0)
c  in CNF:
c    -b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨  b^{1, 752}_2
c    -b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_1
c    -b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨  b^{1, 752}_0
c  in DIMACS:
-3413 -3414  3415 -751  3416 0
-3413 -3414  3415 -751 -3417 0
-3413 -3414  3415 -751  3418 0

c  -1+1 --> 0
c    ( b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0 ∧  p_751) -> (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧ -b^{1, 752}_0)
c  in CNF:
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_2
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_1
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_0
c  in DIMACS:
-3413  3414 -3415 -751 -3416 0
-3413  3414 -3415 -751 -3417 0
-3413  3414 -3415 -751 -3418 0

c  0+1 --> 1
c    (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧  p_751) -> (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0)
c  in CNF:
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_2
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_1
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨  b^{1, 752}_0
c  in DIMACS:
 3413  3414  3415 -751 -3416 0
 3413  3414  3415 -751 -3417 0
 3413  3414  3415 -751  3418 0

c  1+1 --> 2
c    (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0 ∧  p_751) -> (-b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0)
c  in CNF:
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_2
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨  b^{1, 752}_1
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ -p_751 ∨ -b^{1, 752}_0
c  in DIMACS:
 3413  3414 -3415 -751 -3416 0
 3413  3414 -3415 -751  3417 0
 3413  3414 -3415 -751 -3418 0

c  2+1 --> break 
c    (-b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧  p_751) -> break
c  in CNF:
c     b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ -p_751 ∨ break
c  in DIMACS:
 3413 -3414  3415 -751 1162 0


c  2-1 --> 1
c    (-b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧ -p_751) -> (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0)
c  in CNF:
c     b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_2
c     b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_1
c     b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨  b^{1, 752}_0
c  in DIMACS:
 3413 -3414  3415  751 -3416 0
 3413 -3414  3415  751 -3417 0
 3413 -3414  3415  751  3418 0

c  1-1 --> 0
c    (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0 ∧ -p_751) -> (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧ -b^{1, 752}_0)
c  in CNF:
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_2
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_1
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_0
c  in DIMACS:
 3413  3414 -3415  751 -3416 0
 3413  3414 -3415  751 -3417 0
 3413  3414 -3415  751 -3418 0

c  0-1 --> -1
c    (-b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧ -p_751) -> ( b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0)
c  in CNF:
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨  b^{1, 752}_2
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_1
c     b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨  b^{1, 752}_0
c  in DIMACS:
 3413  3414  3415  751  3416 0
 3413  3414  3415  751 -3417 0
 3413  3414  3415  751  3418 0

c  -1-1 --> -2
c    ( b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧  b^{1, 751}_0 ∧ -p_751) -> ( b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0)
c  in CNF:
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨  b^{1, 752}_2
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨  b^{1, 752}_1
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨  p_751 ∨ -b^{1, 752}_0
c  in DIMACS:
-3413  3414 -3415  751  3416 0
-3413  3414 -3415  751  3417 0
-3413  3414 -3415  751 -3418 0

c  -2-1 --> break 
c    ( b^{1, 751}_2 ∧  b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧ -p_751) -> break
c  in CNF:
c    -b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨  b^{1, 751}_0 ∨  p_751 ∨ break
c  in DIMACS:
-3413 -3414  3415  751 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 751}_2 ∧ -b^{1, 751}_1 ∧ -b^{1, 751}_0 ∧ true) 
c  in CNF:
c    -b^{1, 751}_2 ∨  b^{1, 751}_1 ∨  b^{1, 751}_0 ∨ false 
c  in DIMACS:
-3413  3414  3415  0

c  3 does not represent an automaton state.
c    -(-b^{1, 751}_2 ∧  b^{1, 751}_1 ∧  b^{1, 751}_0 ∧ true) 
c  in CNF:
c     b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ false 
c  in DIMACS:
 3413 -3414 -3415  0
c  -3 does not represent an automaton state.
c    -( b^{1, 751}_2 ∧  b^{1, 751}_1 ∧  b^{1, 751}_0 ∧ true) 
c  in CNF:
c    -b^{1, 751}_2 ∨ -b^{1, 751}_1 ∨ -b^{1, 751}_0 ∨ false 
c  in DIMACS:
-3413 -3414 -3415  0

c i = 752
c  -2+1 --> -1
c    ( b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧  p_752) -> ( b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0)
c  in CNF:
c    -b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨  b^{1, 753}_2
c    -b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_1
c    -b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨  b^{1, 753}_0
c  in DIMACS:
-3416 -3417  3418 -752  3419 0
-3416 -3417  3418 -752 -3420 0
-3416 -3417  3418 -752  3421 0

c  -1+1 --> 0
c    ( b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0 ∧  p_752) -> (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧ -b^{1, 753}_0)
c  in CNF:
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_2
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_1
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_0
c  in DIMACS:
-3416  3417 -3418 -752 -3419 0
-3416  3417 -3418 -752 -3420 0
-3416  3417 -3418 -752 -3421 0

c  0+1 --> 1
c    (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧  p_752) -> (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0)
c  in CNF:
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_2
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_1
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨  b^{1, 753}_0
c  in DIMACS:
 3416  3417  3418 -752 -3419 0
 3416  3417  3418 -752 -3420 0
 3416  3417  3418 -752  3421 0

c  1+1 --> 2
c    (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0 ∧  p_752) -> (-b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0)
c  in CNF:
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_2
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨  b^{1, 753}_1
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ -p_752 ∨ -b^{1, 753}_0
c  in DIMACS:
 3416  3417 -3418 -752 -3419 0
 3416  3417 -3418 -752  3420 0
 3416  3417 -3418 -752 -3421 0

c  2+1 --> break 
c    (-b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧  p_752) -> break
c  in CNF:
c     b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 3416 -3417  3418 -752 1162 0


c  2-1 --> 1
c    (-b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧ -p_752) -> (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0)
c  in CNF:
c     b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_2
c     b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_1
c     b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨  b^{1, 753}_0
c  in DIMACS:
 3416 -3417  3418  752 -3419 0
 3416 -3417  3418  752 -3420 0
 3416 -3417  3418  752  3421 0

c  1-1 --> 0
c    (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0 ∧ -p_752) -> (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧ -b^{1, 753}_0)
c  in CNF:
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_2
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_1
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_0
c  in DIMACS:
 3416  3417 -3418  752 -3419 0
 3416  3417 -3418  752 -3420 0
 3416  3417 -3418  752 -3421 0

c  0-1 --> -1
c    (-b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧ -p_752) -> ( b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0)
c  in CNF:
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨  b^{1, 753}_2
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_1
c     b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨  b^{1, 753}_0
c  in DIMACS:
 3416  3417  3418  752  3419 0
 3416  3417  3418  752 -3420 0
 3416  3417  3418  752  3421 0

c  -1-1 --> -2
c    ( b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧  b^{1, 752}_0 ∧ -p_752) -> ( b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0)
c  in CNF:
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨  b^{1, 753}_2
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨  b^{1, 753}_1
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨  p_752 ∨ -b^{1, 753}_0
c  in DIMACS:
-3416  3417 -3418  752  3419 0
-3416  3417 -3418  752  3420 0
-3416  3417 -3418  752 -3421 0

c  -2-1 --> break 
c    ( b^{1, 752}_2 ∧  b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨  b^{1, 752}_0 ∨  p_752 ∨ break
c  in DIMACS:
-3416 -3417  3418  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 752}_2 ∧ -b^{1, 752}_1 ∧ -b^{1, 752}_0 ∧ true) 
c  in CNF:
c    -b^{1, 752}_2 ∨  b^{1, 752}_1 ∨  b^{1, 752}_0 ∨ false 
c  in DIMACS:
-3416  3417  3418  0

c  3 does not represent an automaton state.
c    -(-b^{1, 752}_2 ∧  b^{1, 752}_1 ∧  b^{1, 752}_0 ∧ true) 
c  in CNF:
c     b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ false 
c  in DIMACS:
 3416 -3417 -3418  0
c  -3 does not represent an automaton state.
c    -( b^{1, 752}_2 ∧  b^{1, 752}_1 ∧  b^{1, 752}_0 ∧ true) 
c  in CNF:
c    -b^{1, 752}_2 ∨ -b^{1, 752}_1 ∨ -b^{1, 752}_0 ∨ false 
c  in DIMACS:
-3416 -3417 -3418  0

c i = 753
c  -2+1 --> -1
c    ( b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧  p_753) -> ( b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0)
c  in CNF:
c    -b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨  b^{1, 754}_2
c    -b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_1
c    -b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨  b^{1, 754}_0
c  in DIMACS:
-3419 -3420  3421 -753  3422 0
-3419 -3420  3421 -753 -3423 0
-3419 -3420  3421 -753  3424 0

c  -1+1 --> 0
c    ( b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0 ∧  p_753) -> (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧ -b^{1, 754}_0)
c  in CNF:
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_2
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_1
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_0
c  in DIMACS:
-3419  3420 -3421 -753 -3422 0
-3419  3420 -3421 -753 -3423 0
-3419  3420 -3421 -753 -3424 0

c  0+1 --> 1
c    (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧  p_753) -> (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0)
c  in CNF:
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_2
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_1
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨  b^{1, 754}_0
c  in DIMACS:
 3419  3420  3421 -753 -3422 0
 3419  3420  3421 -753 -3423 0
 3419  3420  3421 -753  3424 0

c  1+1 --> 2
c    (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0 ∧  p_753) -> (-b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0)
c  in CNF:
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_2
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨  b^{1, 754}_1
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ -p_753 ∨ -b^{1, 754}_0
c  in DIMACS:
 3419  3420 -3421 -753 -3422 0
 3419  3420 -3421 -753  3423 0
 3419  3420 -3421 -753 -3424 0

c  2+1 --> break 
c    (-b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧  p_753) -> break
c  in CNF:
c     b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ -p_753 ∨ break
c  in DIMACS:
 3419 -3420  3421 -753 1162 0


c  2-1 --> 1
c    (-b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧ -p_753) -> (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0)
c  in CNF:
c     b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_2
c     b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_1
c     b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨  b^{1, 754}_0
c  in DIMACS:
 3419 -3420  3421  753 -3422 0
 3419 -3420  3421  753 -3423 0
 3419 -3420  3421  753  3424 0

c  1-1 --> 0
c    (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0 ∧ -p_753) -> (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧ -b^{1, 754}_0)
c  in CNF:
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_2
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_1
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_0
c  in DIMACS:
 3419  3420 -3421  753 -3422 0
 3419  3420 -3421  753 -3423 0
 3419  3420 -3421  753 -3424 0

c  0-1 --> -1
c    (-b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧ -p_753) -> ( b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0)
c  in CNF:
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨  b^{1, 754}_2
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_1
c     b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨  b^{1, 754}_0
c  in DIMACS:
 3419  3420  3421  753  3422 0
 3419  3420  3421  753 -3423 0
 3419  3420  3421  753  3424 0

c  -1-1 --> -2
c    ( b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧  b^{1, 753}_0 ∧ -p_753) -> ( b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0)
c  in CNF:
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨  b^{1, 754}_2
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨  b^{1, 754}_1
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨  p_753 ∨ -b^{1, 754}_0
c  in DIMACS:
-3419  3420 -3421  753  3422 0
-3419  3420 -3421  753  3423 0
-3419  3420 -3421  753 -3424 0

c  -2-1 --> break 
c    ( b^{1, 753}_2 ∧  b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧ -p_753) -> break
c  in CNF:
c    -b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨  b^{1, 753}_0 ∨  p_753 ∨ break
c  in DIMACS:
-3419 -3420  3421  753 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 753}_2 ∧ -b^{1, 753}_1 ∧ -b^{1, 753}_0 ∧ true) 
c  in CNF:
c    -b^{1, 753}_2 ∨  b^{1, 753}_1 ∨  b^{1, 753}_0 ∨ false 
c  in DIMACS:
-3419  3420  3421  0

c  3 does not represent an automaton state.
c    -(-b^{1, 753}_2 ∧  b^{1, 753}_1 ∧  b^{1, 753}_0 ∧ true) 
c  in CNF:
c     b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ false 
c  in DIMACS:
 3419 -3420 -3421  0
c  -3 does not represent an automaton state.
c    -( b^{1, 753}_2 ∧  b^{1, 753}_1 ∧  b^{1, 753}_0 ∧ true) 
c  in CNF:
c    -b^{1, 753}_2 ∨ -b^{1, 753}_1 ∨ -b^{1, 753}_0 ∨ false 
c  in DIMACS:
-3419 -3420 -3421  0

c i = 754
c  -2+1 --> -1
c    ( b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧  p_754) -> ( b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0)
c  in CNF:
c    -b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨  b^{1, 755}_2
c    -b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_1
c    -b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨  b^{1, 755}_0
c  in DIMACS:
-3422 -3423  3424 -754  3425 0
-3422 -3423  3424 -754 -3426 0
-3422 -3423  3424 -754  3427 0

c  -1+1 --> 0
c    ( b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0 ∧  p_754) -> (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧ -b^{1, 755}_0)
c  in CNF:
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_2
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_1
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_0
c  in DIMACS:
-3422  3423 -3424 -754 -3425 0
-3422  3423 -3424 -754 -3426 0
-3422  3423 -3424 -754 -3427 0

c  0+1 --> 1
c    (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧  p_754) -> (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0)
c  in CNF:
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_2
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_1
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨  b^{1, 755}_0
c  in DIMACS:
 3422  3423  3424 -754 -3425 0
 3422  3423  3424 -754 -3426 0
 3422  3423  3424 -754  3427 0

c  1+1 --> 2
c    (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0 ∧  p_754) -> (-b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0)
c  in CNF:
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_2
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨  b^{1, 755}_1
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ -p_754 ∨ -b^{1, 755}_0
c  in DIMACS:
 3422  3423 -3424 -754 -3425 0
 3422  3423 -3424 -754  3426 0
 3422  3423 -3424 -754 -3427 0

c  2+1 --> break 
c    (-b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧  p_754) -> break
c  in CNF:
c     b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 3422 -3423  3424 -754 1162 0


c  2-1 --> 1
c    (-b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧ -p_754) -> (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0)
c  in CNF:
c     b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_2
c     b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_1
c     b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨  b^{1, 755}_0
c  in DIMACS:
 3422 -3423  3424  754 -3425 0
 3422 -3423  3424  754 -3426 0
 3422 -3423  3424  754  3427 0

c  1-1 --> 0
c    (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0 ∧ -p_754) -> (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧ -b^{1, 755}_0)
c  in CNF:
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_2
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_1
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_0
c  in DIMACS:
 3422  3423 -3424  754 -3425 0
 3422  3423 -3424  754 -3426 0
 3422  3423 -3424  754 -3427 0

c  0-1 --> -1
c    (-b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧ -p_754) -> ( b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0)
c  in CNF:
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨  b^{1, 755}_2
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_1
c     b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨  b^{1, 755}_0
c  in DIMACS:
 3422  3423  3424  754  3425 0
 3422  3423  3424  754 -3426 0
 3422  3423  3424  754  3427 0

c  -1-1 --> -2
c    ( b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧  b^{1, 754}_0 ∧ -p_754) -> ( b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0)
c  in CNF:
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨  b^{1, 755}_2
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨  b^{1, 755}_1
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨  p_754 ∨ -b^{1, 755}_0
c  in DIMACS:
-3422  3423 -3424  754  3425 0
-3422  3423 -3424  754  3426 0
-3422  3423 -3424  754 -3427 0

c  -2-1 --> break 
c    ( b^{1, 754}_2 ∧  b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨  b^{1, 754}_0 ∨  p_754 ∨ break
c  in DIMACS:
-3422 -3423  3424  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 754}_2 ∧ -b^{1, 754}_1 ∧ -b^{1, 754}_0 ∧ true) 
c  in CNF:
c    -b^{1, 754}_2 ∨  b^{1, 754}_1 ∨  b^{1, 754}_0 ∨ false 
c  in DIMACS:
-3422  3423  3424  0

c  3 does not represent an automaton state.
c    -(-b^{1, 754}_2 ∧  b^{1, 754}_1 ∧  b^{1, 754}_0 ∧ true) 
c  in CNF:
c     b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ false 
c  in DIMACS:
 3422 -3423 -3424  0
c  -3 does not represent an automaton state.
c    -( b^{1, 754}_2 ∧  b^{1, 754}_1 ∧  b^{1, 754}_0 ∧ true) 
c  in CNF:
c    -b^{1, 754}_2 ∨ -b^{1, 754}_1 ∨ -b^{1, 754}_0 ∨ false 
c  in DIMACS:
-3422 -3423 -3424  0

c i = 755
c  -2+1 --> -1
c    ( b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧  p_755) -> ( b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0)
c  in CNF:
c    -b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨  b^{1, 756}_2
c    -b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_1
c    -b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨  b^{1, 756}_0
c  in DIMACS:
-3425 -3426  3427 -755  3428 0
-3425 -3426  3427 -755 -3429 0
-3425 -3426  3427 -755  3430 0

c  -1+1 --> 0
c    ( b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0 ∧  p_755) -> (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧ -b^{1, 756}_0)
c  in CNF:
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_2
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_1
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_0
c  in DIMACS:
-3425  3426 -3427 -755 -3428 0
-3425  3426 -3427 -755 -3429 0
-3425  3426 -3427 -755 -3430 0

c  0+1 --> 1
c    (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧  p_755) -> (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0)
c  in CNF:
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_2
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_1
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨  b^{1, 756}_0
c  in DIMACS:
 3425  3426  3427 -755 -3428 0
 3425  3426  3427 -755 -3429 0
 3425  3426  3427 -755  3430 0

c  1+1 --> 2
c    (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0 ∧  p_755) -> (-b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0)
c  in CNF:
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_2
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨  b^{1, 756}_1
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ -p_755 ∨ -b^{1, 756}_0
c  in DIMACS:
 3425  3426 -3427 -755 -3428 0
 3425  3426 -3427 -755  3429 0
 3425  3426 -3427 -755 -3430 0

c  2+1 --> break 
c    (-b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧  p_755) -> break
c  in CNF:
c     b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ -p_755 ∨ break
c  in DIMACS:
 3425 -3426  3427 -755 1162 0


c  2-1 --> 1
c    (-b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧ -p_755) -> (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0)
c  in CNF:
c     b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_2
c     b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_1
c     b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨  b^{1, 756}_0
c  in DIMACS:
 3425 -3426  3427  755 -3428 0
 3425 -3426  3427  755 -3429 0
 3425 -3426  3427  755  3430 0

c  1-1 --> 0
c    (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0 ∧ -p_755) -> (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧ -b^{1, 756}_0)
c  in CNF:
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_2
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_1
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_0
c  in DIMACS:
 3425  3426 -3427  755 -3428 0
 3425  3426 -3427  755 -3429 0
 3425  3426 -3427  755 -3430 0

c  0-1 --> -1
c    (-b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧ -p_755) -> ( b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0)
c  in CNF:
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨  b^{1, 756}_2
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_1
c     b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨  b^{1, 756}_0
c  in DIMACS:
 3425  3426  3427  755  3428 0
 3425  3426  3427  755 -3429 0
 3425  3426  3427  755  3430 0

c  -1-1 --> -2
c    ( b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧  b^{1, 755}_0 ∧ -p_755) -> ( b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0)
c  in CNF:
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨  b^{1, 756}_2
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨  b^{1, 756}_1
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨  p_755 ∨ -b^{1, 756}_0
c  in DIMACS:
-3425  3426 -3427  755  3428 0
-3425  3426 -3427  755  3429 0
-3425  3426 -3427  755 -3430 0

c  -2-1 --> break 
c    ( b^{1, 755}_2 ∧  b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧ -p_755) -> break
c  in CNF:
c    -b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨  b^{1, 755}_0 ∨  p_755 ∨ break
c  in DIMACS:
-3425 -3426  3427  755 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 755}_2 ∧ -b^{1, 755}_1 ∧ -b^{1, 755}_0 ∧ true) 
c  in CNF:
c    -b^{1, 755}_2 ∨  b^{1, 755}_1 ∨  b^{1, 755}_0 ∨ false 
c  in DIMACS:
-3425  3426  3427  0

c  3 does not represent an automaton state.
c    -(-b^{1, 755}_2 ∧  b^{1, 755}_1 ∧  b^{1, 755}_0 ∧ true) 
c  in CNF:
c     b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ false 
c  in DIMACS:
 3425 -3426 -3427  0
c  -3 does not represent an automaton state.
c    -( b^{1, 755}_2 ∧  b^{1, 755}_1 ∧  b^{1, 755}_0 ∧ true) 
c  in CNF:
c    -b^{1, 755}_2 ∨ -b^{1, 755}_1 ∨ -b^{1, 755}_0 ∨ false 
c  in DIMACS:
-3425 -3426 -3427  0

c i = 756
c  -2+1 --> -1
c    ( b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧  p_756) -> ( b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0)
c  in CNF:
c    -b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨  b^{1, 757}_2
c    -b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_1
c    -b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨  b^{1, 757}_0
c  in DIMACS:
-3428 -3429  3430 -756  3431 0
-3428 -3429  3430 -756 -3432 0
-3428 -3429  3430 -756  3433 0

c  -1+1 --> 0
c    ( b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0 ∧  p_756) -> (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧ -b^{1, 757}_0)
c  in CNF:
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_2
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_1
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_0
c  in DIMACS:
-3428  3429 -3430 -756 -3431 0
-3428  3429 -3430 -756 -3432 0
-3428  3429 -3430 -756 -3433 0

c  0+1 --> 1
c    (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧  p_756) -> (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0)
c  in CNF:
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_2
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_1
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨  b^{1, 757}_0
c  in DIMACS:
 3428  3429  3430 -756 -3431 0
 3428  3429  3430 -756 -3432 0
 3428  3429  3430 -756  3433 0

c  1+1 --> 2
c    (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0 ∧  p_756) -> (-b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0)
c  in CNF:
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_2
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨  b^{1, 757}_1
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ -p_756 ∨ -b^{1, 757}_0
c  in DIMACS:
 3428  3429 -3430 -756 -3431 0
 3428  3429 -3430 -756  3432 0
 3428  3429 -3430 -756 -3433 0

c  2+1 --> break 
c    (-b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧  p_756) -> break
c  in CNF:
c     b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 3428 -3429  3430 -756 1162 0


c  2-1 --> 1
c    (-b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧ -p_756) -> (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0)
c  in CNF:
c     b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_2
c     b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_1
c     b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨  b^{1, 757}_0
c  in DIMACS:
 3428 -3429  3430  756 -3431 0
 3428 -3429  3430  756 -3432 0
 3428 -3429  3430  756  3433 0

c  1-1 --> 0
c    (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0 ∧ -p_756) -> (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧ -b^{1, 757}_0)
c  in CNF:
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_2
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_1
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_0
c  in DIMACS:
 3428  3429 -3430  756 -3431 0
 3428  3429 -3430  756 -3432 0
 3428  3429 -3430  756 -3433 0

c  0-1 --> -1
c    (-b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧ -p_756) -> ( b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0)
c  in CNF:
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨  b^{1, 757}_2
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_1
c     b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨  b^{1, 757}_0
c  in DIMACS:
 3428  3429  3430  756  3431 0
 3428  3429  3430  756 -3432 0
 3428  3429  3430  756  3433 0

c  -1-1 --> -2
c    ( b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧  b^{1, 756}_0 ∧ -p_756) -> ( b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0)
c  in CNF:
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨  b^{1, 757}_2
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨  b^{1, 757}_1
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨  p_756 ∨ -b^{1, 757}_0
c  in DIMACS:
-3428  3429 -3430  756  3431 0
-3428  3429 -3430  756  3432 0
-3428  3429 -3430  756 -3433 0

c  -2-1 --> break 
c    ( b^{1, 756}_2 ∧  b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨  b^{1, 756}_0 ∨  p_756 ∨ break
c  in DIMACS:
-3428 -3429  3430  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 756}_2 ∧ -b^{1, 756}_1 ∧ -b^{1, 756}_0 ∧ true) 
c  in CNF:
c    -b^{1, 756}_2 ∨  b^{1, 756}_1 ∨  b^{1, 756}_0 ∨ false 
c  in DIMACS:
-3428  3429  3430  0

c  3 does not represent an automaton state.
c    -(-b^{1, 756}_2 ∧  b^{1, 756}_1 ∧  b^{1, 756}_0 ∧ true) 
c  in CNF:
c     b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ false 
c  in DIMACS:
 3428 -3429 -3430  0
c  -3 does not represent an automaton state.
c    -( b^{1, 756}_2 ∧  b^{1, 756}_1 ∧  b^{1, 756}_0 ∧ true) 
c  in CNF:
c    -b^{1, 756}_2 ∨ -b^{1, 756}_1 ∨ -b^{1, 756}_0 ∨ false 
c  in DIMACS:
-3428 -3429 -3430  0

c i = 757
c  -2+1 --> -1
c    ( b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧  p_757) -> ( b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0)
c  in CNF:
c    -b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨  b^{1, 758}_2
c    -b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_1
c    -b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨  b^{1, 758}_0
c  in DIMACS:
-3431 -3432  3433 -757  3434 0
-3431 -3432  3433 -757 -3435 0
-3431 -3432  3433 -757  3436 0

c  -1+1 --> 0
c    ( b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0 ∧  p_757) -> (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧ -b^{1, 758}_0)
c  in CNF:
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_2
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_1
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_0
c  in DIMACS:
-3431  3432 -3433 -757 -3434 0
-3431  3432 -3433 -757 -3435 0
-3431  3432 -3433 -757 -3436 0

c  0+1 --> 1
c    (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧  p_757) -> (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0)
c  in CNF:
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_2
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_1
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨  b^{1, 758}_0
c  in DIMACS:
 3431  3432  3433 -757 -3434 0
 3431  3432  3433 -757 -3435 0
 3431  3432  3433 -757  3436 0

c  1+1 --> 2
c    (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0 ∧  p_757) -> (-b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0)
c  in CNF:
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_2
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨  b^{1, 758}_1
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ -p_757 ∨ -b^{1, 758}_0
c  in DIMACS:
 3431  3432 -3433 -757 -3434 0
 3431  3432 -3433 -757  3435 0
 3431  3432 -3433 -757 -3436 0

c  2+1 --> break 
c    (-b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧  p_757) -> break
c  in CNF:
c     b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ -p_757 ∨ break
c  in DIMACS:
 3431 -3432  3433 -757 1162 0


c  2-1 --> 1
c    (-b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧ -p_757) -> (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0)
c  in CNF:
c     b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_2
c     b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_1
c     b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨  b^{1, 758}_0
c  in DIMACS:
 3431 -3432  3433  757 -3434 0
 3431 -3432  3433  757 -3435 0
 3431 -3432  3433  757  3436 0

c  1-1 --> 0
c    (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0 ∧ -p_757) -> (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧ -b^{1, 758}_0)
c  in CNF:
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_2
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_1
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_0
c  in DIMACS:
 3431  3432 -3433  757 -3434 0
 3431  3432 -3433  757 -3435 0
 3431  3432 -3433  757 -3436 0

c  0-1 --> -1
c    (-b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧ -p_757) -> ( b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0)
c  in CNF:
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨  b^{1, 758}_2
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_1
c     b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨  b^{1, 758}_0
c  in DIMACS:
 3431  3432  3433  757  3434 0
 3431  3432  3433  757 -3435 0
 3431  3432  3433  757  3436 0

c  -1-1 --> -2
c    ( b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧  b^{1, 757}_0 ∧ -p_757) -> ( b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0)
c  in CNF:
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨  b^{1, 758}_2
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨  b^{1, 758}_1
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨  p_757 ∨ -b^{1, 758}_0
c  in DIMACS:
-3431  3432 -3433  757  3434 0
-3431  3432 -3433  757  3435 0
-3431  3432 -3433  757 -3436 0

c  -2-1 --> break 
c    ( b^{1, 757}_2 ∧  b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧ -p_757) -> break
c  in CNF:
c    -b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨  b^{1, 757}_0 ∨  p_757 ∨ break
c  in DIMACS:
-3431 -3432  3433  757 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 757}_2 ∧ -b^{1, 757}_1 ∧ -b^{1, 757}_0 ∧ true) 
c  in CNF:
c    -b^{1, 757}_2 ∨  b^{1, 757}_1 ∨  b^{1, 757}_0 ∨ false 
c  in DIMACS:
-3431  3432  3433  0

c  3 does not represent an automaton state.
c    -(-b^{1, 757}_2 ∧  b^{1, 757}_1 ∧  b^{1, 757}_0 ∧ true) 
c  in CNF:
c     b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ false 
c  in DIMACS:
 3431 -3432 -3433  0
c  -3 does not represent an automaton state.
c    -( b^{1, 757}_2 ∧  b^{1, 757}_1 ∧  b^{1, 757}_0 ∧ true) 
c  in CNF:
c    -b^{1, 757}_2 ∨ -b^{1, 757}_1 ∨ -b^{1, 757}_0 ∨ false 
c  in DIMACS:
-3431 -3432 -3433  0

c i = 758
c  -2+1 --> -1
c    ( b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧  p_758) -> ( b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0)
c  in CNF:
c    -b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨  b^{1, 759}_2
c    -b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_1
c    -b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨  b^{1, 759}_0
c  in DIMACS:
-3434 -3435  3436 -758  3437 0
-3434 -3435  3436 -758 -3438 0
-3434 -3435  3436 -758  3439 0

c  -1+1 --> 0
c    ( b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0 ∧  p_758) -> (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧ -b^{1, 759}_0)
c  in CNF:
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_2
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_1
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_0
c  in DIMACS:
-3434  3435 -3436 -758 -3437 0
-3434  3435 -3436 -758 -3438 0
-3434  3435 -3436 -758 -3439 0

c  0+1 --> 1
c    (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧  p_758) -> (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0)
c  in CNF:
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_2
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_1
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨  b^{1, 759}_0
c  in DIMACS:
 3434  3435  3436 -758 -3437 0
 3434  3435  3436 -758 -3438 0
 3434  3435  3436 -758  3439 0

c  1+1 --> 2
c    (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0 ∧  p_758) -> (-b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0)
c  in CNF:
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_2
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨  b^{1, 759}_1
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ -p_758 ∨ -b^{1, 759}_0
c  in DIMACS:
 3434  3435 -3436 -758 -3437 0
 3434  3435 -3436 -758  3438 0
 3434  3435 -3436 -758 -3439 0

c  2+1 --> break 
c    (-b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧  p_758) -> break
c  in CNF:
c     b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ -p_758 ∨ break
c  in DIMACS:
 3434 -3435  3436 -758 1162 0


c  2-1 --> 1
c    (-b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧ -p_758) -> (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0)
c  in CNF:
c     b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_2
c     b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_1
c     b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨  b^{1, 759}_0
c  in DIMACS:
 3434 -3435  3436  758 -3437 0
 3434 -3435  3436  758 -3438 0
 3434 -3435  3436  758  3439 0

c  1-1 --> 0
c    (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0 ∧ -p_758) -> (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧ -b^{1, 759}_0)
c  in CNF:
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_2
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_1
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_0
c  in DIMACS:
 3434  3435 -3436  758 -3437 0
 3434  3435 -3436  758 -3438 0
 3434  3435 -3436  758 -3439 0

c  0-1 --> -1
c    (-b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧ -p_758) -> ( b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0)
c  in CNF:
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨  b^{1, 759}_2
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_1
c     b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨  b^{1, 759}_0
c  in DIMACS:
 3434  3435  3436  758  3437 0
 3434  3435  3436  758 -3438 0
 3434  3435  3436  758  3439 0

c  -1-1 --> -2
c    ( b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧  b^{1, 758}_0 ∧ -p_758) -> ( b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0)
c  in CNF:
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨  b^{1, 759}_2
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨  b^{1, 759}_1
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨  p_758 ∨ -b^{1, 759}_0
c  in DIMACS:
-3434  3435 -3436  758  3437 0
-3434  3435 -3436  758  3438 0
-3434  3435 -3436  758 -3439 0

c  -2-1 --> break 
c    ( b^{1, 758}_2 ∧  b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧ -p_758) -> break
c  in CNF:
c    -b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨  b^{1, 758}_0 ∨  p_758 ∨ break
c  in DIMACS:
-3434 -3435  3436  758 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 758}_2 ∧ -b^{1, 758}_1 ∧ -b^{1, 758}_0 ∧ true) 
c  in CNF:
c    -b^{1, 758}_2 ∨  b^{1, 758}_1 ∨  b^{1, 758}_0 ∨ false 
c  in DIMACS:
-3434  3435  3436  0

c  3 does not represent an automaton state.
c    -(-b^{1, 758}_2 ∧  b^{1, 758}_1 ∧  b^{1, 758}_0 ∧ true) 
c  in CNF:
c     b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ false 
c  in DIMACS:
 3434 -3435 -3436  0
c  -3 does not represent an automaton state.
c    -( b^{1, 758}_2 ∧  b^{1, 758}_1 ∧  b^{1, 758}_0 ∧ true) 
c  in CNF:
c    -b^{1, 758}_2 ∨ -b^{1, 758}_1 ∨ -b^{1, 758}_0 ∨ false 
c  in DIMACS:
-3434 -3435 -3436  0

c i = 759
c  -2+1 --> -1
c    ( b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧  p_759) -> ( b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0)
c  in CNF:
c    -b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨  b^{1, 760}_2
c    -b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_1
c    -b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨  b^{1, 760}_0
c  in DIMACS:
-3437 -3438  3439 -759  3440 0
-3437 -3438  3439 -759 -3441 0
-3437 -3438  3439 -759  3442 0

c  -1+1 --> 0
c    ( b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0 ∧  p_759) -> (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧ -b^{1, 760}_0)
c  in CNF:
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_2
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_1
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_0
c  in DIMACS:
-3437  3438 -3439 -759 -3440 0
-3437  3438 -3439 -759 -3441 0
-3437  3438 -3439 -759 -3442 0

c  0+1 --> 1
c    (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧  p_759) -> (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0)
c  in CNF:
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_2
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_1
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨  b^{1, 760}_0
c  in DIMACS:
 3437  3438  3439 -759 -3440 0
 3437  3438  3439 -759 -3441 0
 3437  3438  3439 -759  3442 0

c  1+1 --> 2
c    (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0 ∧  p_759) -> (-b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0)
c  in CNF:
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_2
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨  b^{1, 760}_1
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ -p_759 ∨ -b^{1, 760}_0
c  in DIMACS:
 3437  3438 -3439 -759 -3440 0
 3437  3438 -3439 -759  3441 0
 3437  3438 -3439 -759 -3442 0

c  2+1 --> break 
c    (-b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧  p_759) -> break
c  in CNF:
c     b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 3437 -3438  3439 -759 1162 0


c  2-1 --> 1
c    (-b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧ -p_759) -> (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0)
c  in CNF:
c     b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_2
c     b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_1
c     b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨  b^{1, 760}_0
c  in DIMACS:
 3437 -3438  3439  759 -3440 0
 3437 -3438  3439  759 -3441 0
 3437 -3438  3439  759  3442 0

c  1-1 --> 0
c    (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0 ∧ -p_759) -> (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧ -b^{1, 760}_0)
c  in CNF:
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_2
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_1
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_0
c  in DIMACS:
 3437  3438 -3439  759 -3440 0
 3437  3438 -3439  759 -3441 0
 3437  3438 -3439  759 -3442 0

c  0-1 --> -1
c    (-b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧ -p_759) -> ( b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0)
c  in CNF:
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨  b^{1, 760}_2
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_1
c     b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨  b^{1, 760}_0
c  in DIMACS:
 3437  3438  3439  759  3440 0
 3437  3438  3439  759 -3441 0
 3437  3438  3439  759  3442 0

c  -1-1 --> -2
c    ( b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧  b^{1, 759}_0 ∧ -p_759) -> ( b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0)
c  in CNF:
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨  b^{1, 760}_2
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨  b^{1, 760}_1
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨  p_759 ∨ -b^{1, 760}_0
c  in DIMACS:
-3437  3438 -3439  759  3440 0
-3437  3438 -3439  759  3441 0
-3437  3438 -3439  759 -3442 0

c  -2-1 --> break 
c    ( b^{1, 759}_2 ∧  b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨  b^{1, 759}_0 ∨  p_759 ∨ break
c  in DIMACS:
-3437 -3438  3439  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 759}_2 ∧ -b^{1, 759}_1 ∧ -b^{1, 759}_0 ∧ true) 
c  in CNF:
c    -b^{1, 759}_2 ∨  b^{1, 759}_1 ∨  b^{1, 759}_0 ∨ false 
c  in DIMACS:
-3437  3438  3439  0

c  3 does not represent an automaton state.
c    -(-b^{1, 759}_2 ∧  b^{1, 759}_1 ∧  b^{1, 759}_0 ∧ true) 
c  in CNF:
c     b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ false 
c  in DIMACS:
 3437 -3438 -3439  0
c  -3 does not represent an automaton state.
c    -( b^{1, 759}_2 ∧  b^{1, 759}_1 ∧  b^{1, 759}_0 ∧ true) 
c  in CNF:
c    -b^{1, 759}_2 ∨ -b^{1, 759}_1 ∨ -b^{1, 759}_0 ∨ false 
c  in DIMACS:
-3437 -3438 -3439  0

c i = 760
c  -2+1 --> -1
c    ( b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧  p_760) -> ( b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0)
c  in CNF:
c    -b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨  b^{1, 761}_2
c    -b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_1
c    -b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨  b^{1, 761}_0
c  in DIMACS:
-3440 -3441  3442 -760  3443 0
-3440 -3441  3442 -760 -3444 0
-3440 -3441  3442 -760  3445 0

c  -1+1 --> 0
c    ( b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0 ∧  p_760) -> (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧ -b^{1, 761}_0)
c  in CNF:
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_2
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_1
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_0
c  in DIMACS:
-3440  3441 -3442 -760 -3443 0
-3440  3441 -3442 -760 -3444 0
-3440  3441 -3442 -760 -3445 0

c  0+1 --> 1
c    (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧  p_760) -> (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0)
c  in CNF:
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_2
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_1
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨  b^{1, 761}_0
c  in DIMACS:
 3440  3441  3442 -760 -3443 0
 3440  3441  3442 -760 -3444 0
 3440  3441  3442 -760  3445 0

c  1+1 --> 2
c    (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0 ∧  p_760) -> (-b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0)
c  in CNF:
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_2
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨  b^{1, 761}_1
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ -p_760 ∨ -b^{1, 761}_0
c  in DIMACS:
 3440  3441 -3442 -760 -3443 0
 3440  3441 -3442 -760  3444 0
 3440  3441 -3442 -760 -3445 0

c  2+1 --> break 
c    (-b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧  p_760) -> break
c  in CNF:
c     b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 3440 -3441  3442 -760 1162 0


c  2-1 --> 1
c    (-b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧ -p_760) -> (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0)
c  in CNF:
c     b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_2
c     b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_1
c     b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨  b^{1, 761}_0
c  in DIMACS:
 3440 -3441  3442  760 -3443 0
 3440 -3441  3442  760 -3444 0
 3440 -3441  3442  760  3445 0

c  1-1 --> 0
c    (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0 ∧ -p_760) -> (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧ -b^{1, 761}_0)
c  in CNF:
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_2
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_1
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_0
c  in DIMACS:
 3440  3441 -3442  760 -3443 0
 3440  3441 -3442  760 -3444 0
 3440  3441 -3442  760 -3445 0

c  0-1 --> -1
c    (-b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧ -p_760) -> ( b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0)
c  in CNF:
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨  b^{1, 761}_2
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_1
c     b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨  b^{1, 761}_0
c  in DIMACS:
 3440  3441  3442  760  3443 0
 3440  3441  3442  760 -3444 0
 3440  3441  3442  760  3445 0

c  -1-1 --> -2
c    ( b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧  b^{1, 760}_0 ∧ -p_760) -> ( b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0)
c  in CNF:
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨  b^{1, 761}_2
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨  b^{1, 761}_1
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨  p_760 ∨ -b^{1, 761}_0
c  in DIMACS:
-3440  3441 -3442  760  3443 0
-3440  3441 -3442  760  3444 0
-3440  3441 -3442  760 -3445 0

c  -2-1 --> break 
c    ( b^{1, 760}_2 ∧  b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨  b^{1, 760}_0 ∨  p_760 ∨ break
c  in DIMACS:
-3440 -3441  3442  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 760}_2 ∧ -b^{1, 760}_1 ∧ -b^{1, 760}_0 ∧ true) 
c  in CNF:
c    -b^{1, 760}_2 ∨  b^{1, 760}_1 ∨  b^{1, 760}_0 ∨ false 
c  in DIMACS:
-3440  3441  3442  0

c  3 does not represent an automaton state.
c    -(-b^{1, 760}_2 ∧  b^{1, 760}_1 ∧  b^{1, 760}_0 ∧ true) 
c  in CNF:
c     b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ false 
c  in DIMACS:
 3440 -3441 -3442  0
c  -3 does not represent an automaton state.
c    -( b^{1, 760}_2 ∧  b^{1, 760}_1 ∧  b^{1, 760}_0 ∧ true) 
c  in CNF:
c    -b^{1, 760}_2 ∨ -b^{1, 760}_1 ∨ -b^{1, 760}_0 ∨ false 
c  in DIMACS:
-3440 -3441 -3442  0

c i = 761
c  -2+1 --> -1
c    ( b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧  p_761) -> ( b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0)
c  in CNF:
c    -b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨  b^{1, 762}_2
c    -b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_1
c    -b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨  b^{1, 762}_0
c  in DIMACS:
-3443 -3444  3445 -761  3446 0
-3443 -3444  3445 -761 -3447 0
-3443 -3444  3445 -761  3448 0

c  -1+1 --> 0
c    ( b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0 ∧  p_761) -> (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧ -b^{1, 762}_0)
c  in CNF:
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_2
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_1
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_0
c  in DIMACS:
-3443  3444 -3445 -761 -3446 0
-3443  3444 -3445 -761 -3447 0
-3443  3444 -3445 -761 -3448 0

c  0+1 --> 1
c    (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧  p_761) -> (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0)
c  in CNF:
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_2
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_1
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨  b^{1, 762}_0
c  in DIMACS:
 3443  3444  3445 -761 -3446 0
 3443  3444  3445 -761 -3447 0
 3443  3444  3445 -761  3448 0

c  1+1 --> 2
c    (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0 ∧  p_761) -> (-b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0)
c  in CNF:
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_2
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨  b^{1, 762}_1
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ -p_761 ∨ -b^{1, 762}_0
c  in DIMACS:
 3443  3444 -3445 -761 -3446 0
 3443  3444 -3445 -761  3447 0
 3443  3444 -3445 -761 -3448 0

c  2+1 --> break 
c    (-b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧  p_761) -> break
c  in CNF:
c     b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ -p_761 ∨ break
c  in DIMACS:
 3443 -3444  3445 -761 1162 0


c  2-1 --> 1
c    (-b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧ -p_761) -> (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0)
c  in CNF:
c     b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_2
c     b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_1
c     b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨  b^{1, 762}_0
c  in DIMACS:
 3443 -3444  3445  761 -3446 0
 3443 -3444  3445  761 -3447 0
 3443 -3444  3445  761  3448 0

c  1-1 --> 0
c    (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0 ∧ -p_761) -> (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧ -b^{1, 762}_0)
c  in CNF:
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_2
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_1
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_0
c  in DIMACS:
 3443  3444 -3445  761 -3446 0
 3443  3444 -3445  761 -3447 0
 3443  3444 -3445  761 -3448 0

c  0-1 --> -1
c    (-b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧ -p_761) -> ( b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0)
c  in CNF:
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨  b^{1, 762}_2
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_1
c     b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨  b^{1, 762}_0
c  in DIMACS:
 3443  3444  3445  761  3446 0
 3443  3444  3445  761 -3447 0
 3443  3444  3445  761  3448 0

c  -1-1 --> -2
c    ( b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧  b^{1, 761}_0 ∧ -p_761) -> ( b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0)
c  in CNF:
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨  b^{1, 762}_2
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨  b^{1, 762}_1
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨  p_761 ∨ -b^{1, 762}_0
c  in DIMACS:
-3443  3444 -3445  761  3446 0
-3443  3444 -3445  761  3447 0
-3443  3444 -3445  761 -3448 0

c  -2-1 --> break 
c    ( b^{1, 761}_2 ∧  b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧ -p_761) -> break
c  in CNF:
c    -b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨  b^{1, 761}_0 ∨  p_761 ∨ break
c  in DIMACS:
-3443 -3444  3445  761 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 761}_2 ∧ -b^{1, 761}_1 ∧ -b^{1, 761}_0 ∧ true) 
c  in CNF:
c    -b^{1, 761}_2 ∨  b^{1, 761}_1 ∨  b^{1, 761}_0 ∨ false 
c  in DIMACS:
-3443  3444  3445  0

c  3 does not represent an automaton state.
c    -(-b^{1, 761}_2 ∧  b^{1, 761}_1 ∧  b^{1, 761}_0 ∧ true) 
c  in CNF:
c     b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ false 
c  in DIMACS:
 3443 -3444 -3445  0
c  -3 does not represent an automaton state.
c    -( b^{1, 761}_2 ∧  b^{1, 761}_1 ∧  b^{1, 761}_0 ∧ true) 
c  in CNF:
c    -b^{1, 761}_2 ∨ -b^{1, 761}_1 ∨ -b^{1, 761}_0 ∨ false 
c  in DIMACS:
-3443 -3444 -3445  0

c i = 762
c  -2+1 --> -1
c    ( b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧  p_762) -> ( b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0)
c  in CNF:
c    -b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨  b^{1, 763}_2
c    -b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_1
c    -b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨  b^{1, 763}_0
c  in DIMACS:
-3446 -3447  3448 -762  3449 0
-3446 -3447  3448 -762 -3450 0
-3446 -3447  3448 -762  3451 0

c  -1+1 --> 0
c    ( b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0 ∧  p_762) -> (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧ -b^{1, 763}_0)
c  in CNF:
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_2
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_1
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_0
c  in DIMACS:
-3446  3447 -3448 -762 -3449 0
-3446  3447 -3448 -762 -3450 0
-3446  3447 -3448 -762 -3451 0

c  0+1 --> 1
c    (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧  p_762) -> (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0)
c  in CNF:
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_2
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_1
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨  b^{1, 763}_0
c  in DIMACS:
 3446  3447  3448 -762 -3449 0
 3446  3447  3448 -762 -3450 0
 3446  3447  3448 -762  3451 0

c  1+1 --> 2
c    (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0 ∧  p_762) -> (-b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0)
c  in CNF:
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_2
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨  b^{1, 763}_1
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ -p_762 ∨ -b^{1, 763}_0
c  in DIMACS:
 3446  3447 -3448 -762 -3449 0
 3446  3447 -3448 -762  3450 0
 3446  3447 -3448 -762 -3451 0

c  2+1 --> break 
c    (-b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧  p_762) -> break
c  in CNF:
c     b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 3446 -3447  3448 -762 1162 0


c  2-1 --> 1
c    (-b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧ -p_762) -> (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0)
c  in CNF:
c     b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_2
c     b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_1
c     b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨  b^{1, 763}_0
c  in DIMACS:
 3446 -3447  3448  762 -3449 0
 3446 -3447  3448  762 -3450 0
 3446 -3447  3448  762  3451 0

c  1-1 --> 0
c    (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0 ∧ -p_762) -> (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧ -b^{1, 763}_0)
c  in CNF:
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_2
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_1
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_0
c  in DIMACS:
 3446  3447 -3448  762 -3449 0
 3446  3447 -3448  762 -3450 0
 3446  3447 -3448  762 -3451 0

c  0-1 --> -1
c    (-b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧ -p_762) -> ( b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0)
c  in CNF:
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨  b^{1, 763}_2
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_1
c     b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨  b^{1, 763}_0
c  in DIMACS:
 3446  3447  3448  762  3449 0
 3446  3447  3448  762 -3450 0
 3446  3447  3448  762  3451 0

c  -1-1 --> -2
c    ( b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧  b^{1, 762}_0 ∧ -p_762) -> ( b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0)
c  in CNF:
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨  b^{1, 763}_2
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨  b^{1, 763}_1
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨  p_762 ∨ -b^{1, 763}_0
c  in DIMACS:
-3446  3447 -3448  762  3449 0
-3446  3447 -3448  762  3450 0
-3446  3447 -3448  762 -3451 0

c  -2-1 --> break 
c    ( b^{1, 762}_2 ∧  b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨  b^{1, 762}_0 ∨  p_762 ∨ break
c  in DIMACS:
-3446 -3447  3448  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 762}_2 ∧ -b^{1, 762}_1 ∧ -b^{1, 762}_0 ∧ true) 
c  in CNF:
c    -b^{1, 762}_2 ∨  b^{1, 762}_1 ∨  b^{1, 762}_0 ∨ false 
c  in DIMACS:
-3446  3447  3448  0

c  3 does not represent an automaton state.
c    -(-b^{1, 762}_2 ∧  b^{1, 762}_1 ∧  b^{1, 762}_0 ∧ true) 
c  in CNF:
c     b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ false 
c  in DIMACS:
 3446 -3447 -3448  0
c  -3 does not represent an automaton state.
c    -( b^{1, 762}_2 ∧  b^{1, 762}_1 ∧  b^{1, 762}_0 ∧ true) 
c  in CNF:
c    -b^{1, 762}_2 ∨ -b^{1, 762}_1 ∨ -b^{1, 762}_0 ∨ false 
c  in DIMACS:
-3446 -3447 -3448  0

c i = 763
c  -2+1 --> -1
c    ( b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧  p_763) -> ( b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0)
c  in CNF:
c    -b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨  b^{1, 764}_2
c    -b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_1
c    -b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨  b^{1, 764}_0
c  in DIMACS:
-3449 -3450  3451 -763  3452 0
-3449 -3450  3451 -763 -3453 0
-3449 -3450  3451 -763  3454 0

c  -1+1 --> 0
c    ( b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0 ∧  p_763) -> (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧ -b^{1, 764}_0)
c  in CNF:
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_2
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_1
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_0
c  in DIMACS:
-3449  3450 -3451 -763 -3452 0
-3449  3450 -3451 -763 -3453 0
-3449  3450 -3451 -763 -3454 0

c  0+1 --> 1
c    (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧  p_763) -> (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0)
c  in CNF:
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_2
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_1
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨  b^{1, 764}_0
c  in DIMACS:
 3449  3450  3451 -763 -3452 0
 3449  3450  3451 -763 -3453 0
 3449  3450  3451 -763  3454 0

c  1+1 --> 2
c    (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0 ∧  p_763) -> (-b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0)
c  in CNF:
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_2
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨  b^{1, 764}_1
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ -p_763 ∨ -b^{1, 764}_0
c  in DIMACS:
 3449  3450 -3451 -763 -3452 0
 3449  3450 -3451 -763  3453 0
 3449  3450 -3451 -763 -3454 0

c  2+1 --> break 
c    (-b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧  p_763) -> break
c  in CNF:
c     b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ -p_763 ∨ break
c  in DIMACS:
 3449 -3450  3451 -763 1162 0


c  2-1 --> 1
c    (-b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧ -p_763) -> (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0)
c  in CNF:
c     b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_2
c     b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_1
c     b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨  b^{1, 764}_0
c  in DIMACS:
 3449 -3450  3451  763 -3452 0
 3449 -3450  3451  763 -3453 0
 3449 -3450  3451  763  3454 0

c  1-1 --> 0
c    (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0 ∧ -p_763) -> (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧ -b^{1, 764}_0)
c  in CNF:
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_2
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_1
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_0
c  in DIMACS:
 3449  3450 -3451  763 -3452 0
 3449  3450 -3451  763 -3453 0
 3449  3450 -3451  763 -3454 0

c  0-1 --> -1
c    (-b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧ -p_763) -> ( b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0)
c  in CNF:
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨  b^{1, 764}_2
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_1
c     b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨  b^{1, 764}_0
c  in DIMACS:
 3449  3450  3451  763  3452 0
 3449  3450  3451  763 -3453 0
 3449  3450  3451  763  3454 0

c  -1-1 --> -2
c    ( b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧  b^{1, 763}_0 ∧ -p_763) -> ( b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0)
c  in CNF:
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨  b^{1, 764}_2
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨  b^{1, 764}_1
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨  p_763 ∨ -b^{1, 764}_0
c  in DIMACS:
-3449  3450 -3451  763  3452 0
-3449  3450 -3451  763  3453 0
-3449  3450 -3451  763 -3454 0

c  -2-1 --> break 
c    ( b^{1, 763}_2 ∧  b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧ -p_763) -> break
c  in CNF:
c    -b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨  b^{1, 763}_0 ∨  p_763 ∨ break
c  in DIMACS:
-3449 -3450  3451  763 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 763}_2 ∧ -b^{1, 763}_1 ∧ -b^{1, 763}_0 ∧ true) 
c  in CNF:
c    -b^{1, 763}_2 ∨  b^{1, 763}_1 ∨  b^{1, 763}_0 ∨ false 
c  in DIMACS:
-3449  3450  3451  0

c  3 does not represent an automaton state.
c    -(-b^{1, 763}_2 ∧  b^{1, 763}_1 ∧  b^{1, 763}_0 ∧ true) 
c  in CNF:
c     b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ false 
c  in DIMACS:
 3449 -3450 -3451  0
c  -3 does not represent an automaton state.
c    -( b^{1, 763}_2 ∧  b^{1, 763}_1 ∧  b^{1, 763}_0 ∧ true) 
c  in CNF:
c    -b^{1, 763}_2 ∨ -b^{1, 763}_1 ∨ -b^{1, 763}_0 ∨ false 
c  in DIMACS:
-3449 -3450 -3451  0

c i = 764
c  -2+1 --> -1
c    ( b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧  p_764) -> ( b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0)
c  in CNF:
c    -b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨  b^{1, 765}_2
c    -b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_1
c    -b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨  b^{1, 765}_0
c  in DIMACS:
-3452 -3453  3454 -764  3455 0
-3452 -3453  3454 -764 -3456 0
-3452 -3453  3454 -764  3457 0

c  -1+1 --> 0
c    ( b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0 ∧  p_764) -> (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧ -b^{1, 765}_0)
c  in CNF:
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_2
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_1
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_0
c  in DIMACS:
-3452  3453 -3454 -764 -3455 0
-3452  3453 -3454 -764 -3456 0
-3452  3453 -3454 -764 -3457 0

c  0+1 --> 1
c    (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧  p_764) -> (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0)
c  in CNF:
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_2
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_1
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨  b^{1, 765}_0
c  in DIMACS:
 3452  3453  3454 -764 -3455 0
 3452  3453  3454 -764 -3456 0
 3452  3453  3454 -764  3457 0

c  1+1 --> 2
c    (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0 ∧  p_764) -> (-b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0)
c  in CNF:
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_2
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨  b^{1, 765}_1
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ -p_764 ∨ -b^{1, 765}_0
c  in DIMACS:
 3452  3453 -3454 -764 -3455 0
 3452  3453 -3454 -764  3456 0
 3452  3453 -3454 -764 -3457 0

c  2+1 --> break 
c    (-b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧  p_764) -> break
c  in CNF:
c     b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ -p_764 ∨ break
c  in DIMACS:
 3452 -3453  3454 -764 1162 0


c  2-1 --> 1
c    (-b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧ -p_764) -> (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0)
c  in CNF:
c     b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_2
c     b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_1
c     b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨  b^{1, 765}_0
c  in DIMACS:
 3452 -3453  3454  764 -3455 0
 3452 -3453  3454  764 -3456 0
 3452 -3453  3454  764  3457 0

c  1-1 --> 0
c    (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0 ∧ -p_764) -> (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧ -b^{1, 765}_0)
c  in CNF:
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_2
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_1
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_0
c  in DIMACS:
 3452  3453 -3454  764 -3455 0
 3452  3453 -3454  764 -3456 0
 3452  3453 -3454  764 -3457 0

c  0-1 --> -1
c    (-b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧ -p_764) -> ( b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0)
c  in CNF:
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨  b^{1, 765}_2
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_1
c     b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨  b^{1, 765}_0
c  in DIMACS:
 3452  3453  3454  764  3455 0
 3452  3453  3454  764 -3456 0
 3452  3453  3454  764  3457 0

c  -1-1 --> -2
c    ( b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧  b^{1, 764}_0 ∧ -p_764) -> ( b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0)
c  in CNF:
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨  b^{1, 765}_2
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨  b^{1, 765}_1
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨  p_764 ∨ -b^{1, 765}_0
c  in DIMACS:
-3452  3453 -3454  764  3455 0
-3452  3453 -3454  764  3456 0
-3452  3453 -3454  764 -3457 0

c  -2-1 --> break 
c    ( b^{1, 764}_2 ∧  b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧ -p_764) -> break
c  in CNF:
c    -b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨  b^{1, 764}_0 ∨  p_764 ∨ break
c  in DIMACS:
-3452 -3453  3454  764 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 764}_2 ∧ -b^{1, 764}_1 ∧ -b^{1, 764}_0 ∧ true) 
c  in CNF:
c    -b^{1, 764}_2 ∨  b^{1, 764}_1 ∨  b^{1, 764}_0 ∨ false 
c  in DIMACS:
-3452  3453  3454  0

c  3 does not represent an automaton state.
c    -(-b^{1, 764}_2 ∧  b^{1, 764}_1 ∧  b^{1, 764}_0 ∧ true) 
c  in CNF:
c     b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ false 
c  in DIMACS:
 3452 -3453 -3454  0
c  -3 does not represent an automaton state.
c    -( b^{1, 764}_2 ∧  b^{1, 764}_1 ∧  b^{1, 764}_0 ∧ true) 
c  in CNF:
c    -b^{1, 764}_2 ∨ -b^{1, 764}_1 ∨ -b^{1, 764}_0 ∨ false 
c  in DIMACS:
-3452 -3453 -3454  0

c i = 765
c  -2+1 --> -1
c    ( b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧  p_765) -> ( b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0)
c  in CNF:
c    -b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨  b^{1, 766}_2
c    -b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_1
c    -b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨  b^{1, 766}_0
c  in DIMACS:
-3455 -3456  3457 -765  3458 0
-3455 -3456  3457 -765 -3459 0
-3455 -3456  3457 -765  3460 0

c  -1+1 --> 0
c    ( b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0 ∧  p_765) -> (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧ -b^{1, 766}_0)
c  in CNF:
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_2
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_1
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_0
c  in DIMACS:
-3455  3456 -3457 -765 -3458 0
-3455  3456 -3457 -765 -3459 0
-3455  3456 -3457 -765 -3460 0

c  0+1 --> 1
c    (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧  p_765) -> (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0)
c  in CNF:
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_2
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_1
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨  b^{1, 766}_0
c  in DIMACS:
 3455  3456  3457 -765 -3458 0
 3455  3456  3457 -765 -3459 0
 3455  3456  3457 -765  3460 0

c  1+1 --> 2
c    (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0 ∧  p_765) -> (-b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0)
c  in CNF:
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_2
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨  b^{1, 766}_1
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ -p_765 ∨ -b^{1, 766}_0
c  in DIMACS:
 3455  3456 -3457 -765 -3458 0
 3455  3456 -3457 -765  3459 0
 3455  3456 -3457 -765 -3460 0

c  2+1 --> break 
c    (-b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧  p_765) -> break
c  in CNF:
c     b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 3455 -3456  3457 -765 1162 0


c  2-1 --> 1
c    (-b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧ -p_765) -> (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0)
c  in CNF:
c     b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_2
c     b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_1
c     b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨  b^{1, 766}_0
c  in DIMACS:
 3455 -3456  3457  765 -3458 0
 3455 -3456  3457  765 -3459 0
 3455 -3456  3457  765  3460 0

c  1-1 --> 0
c    (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0 ∧ -p_765) -> (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧ -b^{1, 766}_0)
c  in CNF:
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_2
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_1
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_0
c  in DIMACS:
 3455  3456 -3457  765 -3458 0
 3455  3456 -3457  765 -3459 0
 3455  3456 -3457  765 -3460 0

c  0-1 --> -1
c    (-b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧ -p_765) -> ( b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0)
c  in CNF:
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨  b^{1, 766}_2
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_1
c     b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨  b^{1, 766}_0
c  in DIMACS:
 3455  3456  3457  765  3458 0
 3455  3456  3457  765 -3459 0
 3455  3456  3457  765  3460 0

c  -1-1 --> -2
c    ( b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧  b^{1, 765}_0 ∧ -p_765) -> ( b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0)
c  in CNF:
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨  b^{1, 766}_2
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨  b^{1, 766}_1
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨  p_765 ∨ -b^{1, 766}_0
c  in DIMACS:
-3455  3456 -3457  765  3458 0
-3455  3456 -3457  765  3459 0
-3455  3456 -3457  765 -3460 0

c  -2-1 --> break 
c    ( b^{1, 765}_2 ∧  b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨  b^{1, 765}_0 ∨  p_765 ∨ break
c  in DIMACS:
-3455 -3456  3457  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 765}_2 ∧ -b^{1, 765}_1 ∧ -b^{1, 765}_0 ∧ true) 
c  in CNF:
c    -b^{1, 765}_2 ∨  b^{1, 765}_1 ∨  b^{1, 765}_0 ∨ false 
c  in DIMACS:
-3455  3456  3457  0

c  3 does not represent an automaton state.
c    -(-b^{1, 765}_2 ∧  b^{1, 765}_1 ∧  b^{1, 765}_0 ∧ true) 
c  in CNF:
c     b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ false 
c  in DIMACS:
 3455 -3456 -3457  0
c  -3 does not represent an automaton state.
c    -( b^{1, 765}_2 ∧  b^{1, 765}_1 ∧  b^{1, 765}_0 ∧ true) 
c  in CNF:
c    -b^{1, 765}_2 ∨ -b^{1, 765}_1 ∨ -b^{1, 765}_0 ∨ false 
c  in DIMACS:
-3455 -3456 -3457  0

c i = 766
c  -2+1 --> -1
c    ( b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧  p_766) -> ( b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0)
c  in CNF:
c    -b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨  b^{1, 767}_2
c    -b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_1
c    -b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨  b^{1, 767}_0
c  in DIMACS:
-3458 -3459  3460 -766  3461 0
-3458 -3459  3460 -766 -3462 0
-3458 -3459  3460 -766  3463 0

c  -1+1 --> 0
c    ( b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0 ∧  p_766) -> (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧ -b^{1, 767}_0)
c  in CNF:
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_2
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_1
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_0
c  in DIMACS:
-3458  3459 -3460 -766 -3461 0
-3458  3459 -3460 -766 -3462 0
-3458  3459 -3460 -766 -3463 0

c  0+1 --> 1
c    (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧  p_766) -> (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0)
c  in CNF:
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_2
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_1
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨  b^{1, 767}_0
c  in DIMACS:
 3458  3459  3460 -766 -3461 0
 3458  3459  3460 -766 -3462 0
 3458  3459  3460 -766  3463 0

c  1+1 --> 2
c    (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0 ∧  p_766) -> (-b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0)
c  in CNF:
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_2
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨  b^{1, 767}_1
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ -p_766 ∨ -b^{1, 767}_0
c  in DIMACS:
 3458  3459 -3460 -766 -3461 0
 3458  3459 -3460 -766  3462 0
 3458  3459 -3460 -766 -3463 0

c  2+1 --> break 
c    (-b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧  p_766) -> break
c  in CNF:
c     b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ -p_766 ∨ break
c  in DIMACS:
 3458 -3459  3460 -766 1162 0


c  2-1 --> 1
c    (-b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧ -p_766) -> (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0)
c  in CNF:
c     b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_2
c     b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_1
c     b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨  b^{1, 767}_0
c  in DIMACS:
 3458 -3459  3460  766 -3461 0
 3458 -3459  3460  766 -3462 0
 3458 -3459  3460  766  3463 0

c  1-1 --> 0
c    (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0 ∧ -p_766) -> (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧ -b^{1, 767}_0)
c  in CNF:
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_2
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_1
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_0
c  in DIMACS:
 3458  3459 -3460  766 -3461 0
 3458  3459 -3460  766 -3462 0
 3458  3459 -3460  766 -3463 0

c  0-1 --> -1
c    (-b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧ -p_766) -> ( b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0)
c  in CNF:
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨  b^{1, 767}_2
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_1
c     b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨  b^{1, 767}_0
c  in DIMACS:
 3458  3459  3460  766  3461 0
 3458  3459  3460  766 -3462 0
 3458  3459  3460  766  3463 0

c  -1-1 --> -2
c    ( b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧  b^{1, 766}_0 ∧ -p_766) -> ( b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0)
c  in CNF:
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨  b^{1, 767}_2
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨  b^{1, 767}_1
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨  p_766 ∨ -b^{1, 767}_0
c  in DIMACS:
-3458  3459 -3460  766  3461 0
-3458  3459 -3460  766  3462 0
-3458  3459 -3460  766 -3463 0

c  -2-1 --> break 
c    ( b^{1, 766}_2 ∧  b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧ -p_766) -> break
c  in CNF:
c    -b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨  b^{1, 766}_0 ∨  p_766 ∨ break
c  in DIMACS:
-3458 -3459  3460  766 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 766}_2 ∧ -b^{1, 766}_1 ∧ -b^{1, 766}_0 ∧ true) 
c  in CNF:
c    -b^{1, 766}_2 ∨  b^{1, 766}_1 ∨  b^{1, 766}_0 ∨ false 
c  in DIMACS:
-3458  3459  3460  0

c  3 does not represent an automaton state.
c    -(-b^{1, 766}_2 ∧  b^{1, 766}_1 ∧  b^{1, 766}_0 ∧ true) 
c  in CNF:
c     b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ false 
c  in DIMACS:
 3458 -3459 -3460  0
c  -3 does not represent an automaton state.
c    -( b^{1, 766}_2 ∧  b^{1, 766}_1 ∧  b^{1, 766}_0 ∧ true) 
c  in CNF:
c    -b^{1, 766}_2 ∨ -b^{1, 766}_1 ∨ -b^{1, 766}_0 ∨ false 
c  in DIMACS:
-3458 -3459 -3460  0

c i = 767
c  -2+1 --> -1
c    ( b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧  p_767) -> ( b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0)
c  in CNF:
c    -b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨  b^{1, 768}_2
c    -b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_1
c    -b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨  b^{1, 768}_0
c  in DIMACS:
-3461 -3462  3463 -767  3464 0
-3461 -3462  3463 -767 -3465 0
-3461 -3462  3463 -767  3466 0

c  -1+1 --> 0
c    ( b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0 ∧  p_767) -> (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧ -b^{1, 768}_0)
c  in CNF:
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_2
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_1
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_0
c  in DIMACS:
-3461  3462 -3463 -767 -3464 0
-3461  3462 -3463 -767 -3465 0
-3461  3462 -3463 -767 -3466 0

c  0+1 --> 1
c    (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧  p_767) -> (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0)
c  in CNF:
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_2
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_1
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨  b^{1, 768}_0
c  in DIMACS:
 3461  3462  3463 -767 -3464 0
 3461  3462  3463 -767 -3465 0
 3461  3462  3463 -767  3466 0

c  1+1 --> 2
c    (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0 ∧  p_767) -> (-b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0)
c  in CNF:
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_2
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨  b^{1, 768}_1
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ -p_767 ∨ -b^{1, 768}_0
c  in DIMACS:
 3461  3462 -3463 -767 -3464 0
 3461  3462 -3463 -767  3465 0
 3461  3462 -3463 -767 -3466 0

c  2+1 --> break 
c    (-b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧  p_767) -> break
c  in CNF:
c     b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ -p_767 ∨ break
c  in DIMACS:
 3461 -3462  3463 -767 1162 0


c  2-1 --> 1
c    (-b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧ -p_767) -> (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0)
c  in CNF:
c     b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_2
c     b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_1
c     b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨  b^{1, 768}_0
c  in DIMACS:
 3461 -3462  3463  767 -3464 0
 3461 -3462  3463  767 -3465 0
 3461 -3462  3463  767  3466 0

c  1-1 --> 0
c    (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0 ∧ -p_767) -> (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧ -b^{1, 768}_0)
c  in CNF:
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_2
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_1
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_0
c  in DIMACS:
 3461  3462 -3463  767 -3464 0
 3461  3462 -3463  767 -3465 0
 3461  3462 -3463  767 -3466 0

c  0-1 --> -1
c    (-b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧ -p_767) -> ( b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0)
c  in CNF:
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨  b^{1, 768}_2
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_1
c     b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨  b^{1, 768}_0
c  in DIMACS:
 3461  3462  3463  767  3464 0
 3461  3462  3463  767 -3465 0
 3461  3462  3463  767  3466 0

c  -1-1 --> -2
c    ( b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧  b^{1, 767}_0 ∧ -p_767) -> ( b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0)
c  in CNF:
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨  b^{1, 768}_2
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨  b^{1, 768}_1
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨  p_767 ∨ -b^{1, 768}_0
c  in DIMACS:
-3461  3462 -3463  767  3464 0
-3461  3462 -3463  767  3465 0
-3461  3462 -3463  767 -3466 0

c  -2-1 --> break 
c    ( b^{1, 767}_2 ∧  b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧ -p_767) -> break
c  in CNF:
c    -b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨  b^{1, 767}_0 ∨  p_767 ∨ break
c  in DIMACS:
-3461 -3462  3463  767 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 767}_2 ∧ -b^{1, 767}_1 ∧ -b^{1, 767}_0 ∧ true) 
c  in CNF:
c    -b^{1, 767}_2 ∨  b^{1, 767}_1 ∨  b^{1, 767}_0 ∨ false 
c  in DIMACS:
-3461  3462  3463  0

c  3 does not represent an automaton state.
c    -(-b^{1, 767}_2 ∧  b^{1, 767}_1 ∧  b^{1, 767}_0 ∧ true) 
c  in CNF:
c     b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ false 
c  in DIMACS:
 3461 -3462 -3463  0
c  -3 does not represent an automaton state.
c    -( b^{1, 767}_2 ∧  b^{1, 767}_1 ∧  b^{1, 767}_0 ∧ true) 
c  in CNF:
c    -b^{1, 767}_2 ∨ -b^{1, 767}_1 ∨ -b^{1, 767}_0 ∨ false 
c  in DIMACS:
-3461 -3462 -3463  0

c i = 768
c  -2+1 --> -1
c    ( b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧  p_768) -> ( b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0)
c  in CNF:
c    -b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨  b^{1, 769}_2
c    -b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_1
c    -b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨  b^{1, 769}_0
c  in DIMACS:
-3464 -3465  3466 -768  3467 0
-3464 -3465  3466 -768 -3468 0
-3464 -3465  3466 -768  3469 0

c  -1+1 --> 0
c    ( b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0 ∧  p_768) -> (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧ -b^{1, 769}_0)
c  in CNF:
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_2
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_1
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_0
c  in DIMACS:
-3464  3465 -3466 -768 -3467 0
-3464  3465 -3466 -768 -3468 0
-3464  3465 -3466 -768 -3469 0

c  0+1 --> 1
c    (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧  p_768) -> (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0)
c  in CNF:
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_2
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_1
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨  b^{1, 769}_0
c  in DIMACS:
 3464  3465  3466 -768 -3467 0
 3464  3465  3466 -768 -3468 0
 3464  3465  3466 -768  3469 0

c  1+1 --> 2
c    (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0 ∧  p_768) -> (-b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0)
c  in CNF:
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_2
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨  b^{1, 769}_1
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ -p_768 ∨ -b^{1, 769}_0
c  in DIMACS:
 3464  3465 -3466 -768 -3467 0
 3464  3465 -3466 -768  3468 0
 3464  3465 -3466 -768 -3469 0

c  2+1 --> break 
c    (-b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧  p_768) -> break
c  in CNF:
c     b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 3464 -3465  3466 -768 1162 0


c  2-1 --> 1
c    (-b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧ -p_768) -> (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0)
c  in CNF:
c     b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_2
c     b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_1
c     b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨  b^{1, 769}_0
c  in DIMACS:
 3464 -3465  3466  768 -3467 0
 3464 -3465  3466  768 -3468 0
 3464 -3465  3466  768  3469 0

c  1-1 --> 0
c    (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0 ∧ -p_768) -> (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧ -b^{1, 769}_0)
c  in CNF:
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_2
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_1
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_0
c  in DIMACS:
 3464  3465 -3466  768 -3467 0
 3464  3465 -3466  768 -3468 0
 3464  3465 -3466  768 -3469 0

c  0-1 --> -1
c    (-b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧ -p_768) -> ( b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0)
c  in CNF:
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨  b^{1, 769}_2
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_1
c     b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨  b^{1, 769}_0
c  in DIMACS:
 3464  3465  3466  768  3467 0
 3464  3465  3466  768 -3468 0
 3464  3465  3466  768  3469 0

c  -1-1 --> -2
c    ( b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧  b^{1, 768}_0 ∧ -p_768) -> ( b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0)
c  in CNF:
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨  b^{1, 769}_2
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨  b^{1, 769}_1
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨  p_768 ∨ -b^{1, 769}_0
c  in DIMACS:
-3464  3465 -3466  768  3467 0
-3464  3465 -3466  768  3468 0
-3464  3465 -3466  768 -3469 0

c  -2-1 --> break 
c    ( b^{1, 768}_2 ∧  b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨  b^{1, 768}_0 ∨  p_768 ∨ break
c  in DIMACS:
-3464 -3465  3466  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 768}_2 ∧ -b^{1, 768}_1 ∧ -b^{1, 768}_0 ∧ true) 
c  in CNF:
c    -b^{1, 768}_2 ∨  b^{1, 768}_1 ∨  b^{1, 768}_0 ∨ false 
c  in DIMACS:
-3464  3465  3466  0

c  3 does not represent an automaton state.
c    -(-b^{1, 768}_2 ∧  b^{1, 768}_1 ∧  b^{1, 768}_0 ∧ true) 
c  in CNF:
c     b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ false 
c  in DIMACS:
 3464 -3465 -3466  0
c  -3 does not represent an automaton state.
c    -( b^{1, 768}_2 ∧  b^{1, 768}_1 ∧  b^{1, 768}_0 ∧ true) 
c  in CNF:
c    -b^{1, 768}_2 ∨ -b^{1, 768}_1 ∨ -b^{1, 768}_0 ∨ false 
c  in DIMACS:
-3464 -3465 -3466  0

c i = 769
c  -2+1 --> -1
c    ( b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧  p_769) -> ( b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0)
c  in CNF:
c    -b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨  b^{1, 770}_2
c    -b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_1
c    -b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨  b^{1, 770}_0
c  in DIMACS:
-3467 -3468  3469 -769  3470 0
-3467 -3468  3469 -769 -3471 0
-3467 -3468  3469 -769  3472 0

c  -1+1 --> 0
c    ( b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0 ∧  p_769) -> (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧ -b^{1, 770}_0)
c  in CNF:
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_2
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_1
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_0
c  in DIMACS:
-3467  3468 -3469 -769 -3470 0
-3467  3468 -3469 -769 -3471 0
-3467  3468 -3469 -769 -3472 0

c  0+1 --> 1
c    (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧  p_769) -> (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0)
c  in CNF:
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_2
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_1
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨  b^{1, 770}_0
c  in DIMACS:
 3467  3468  3469 -769 -3470 0
 3467  3468  3469 -769 -3471 0
 3467  3468  3469 -769  3472 0

c  1+1 --> 2
c    (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0 ∧  p_769) -> (-b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0)
c  in CNF:
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_2
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨  b^{1, 770}_1
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ -p_769 ∨ -b^{1, 770}_0
c  in DIMACS:
 3467  3468 -3469 -769 -3470 0
 3467  3468 -3469 -769  3471 0
 3467  3468 -3469 -769 -3472 0

c  2+1 --> break 
c    (-b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧  p_769) -> break
c  in CNF:
c     b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ -p_769 ∨ break
c  in DIMACS:
 3467 -3468  3469 -769 1162 0


c  2-1 --> 1
c    (-b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧ -p_769) -> (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0)
c  in CNF:
c     b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_2
c     b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_1
c     b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨  b^{1, 770}_0
c  in DIMACS:
 3467 -3468  3469  769 -3470 0
 3467 -3468  3469  769 -3471 0
 3467 -3468  3469  769  3472 0

c  1-1 --> 0
c    (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0 ∧ -p_769) -> (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧ -b^{1, 770}_0)
c  in CNF:
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_2
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_1
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_0
c  in DIMACS:
 3467  3468 -3469  769 -3470 0
 3467  3468 -3469  769 -3471 0
 3467  3468 -3469  769 -3472 0

c  0-1 --> -1
c    (-b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧ -p_769) -> ( b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0)
c  in CNF:
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨  b^{1, 770}_2
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_1
c     b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨  b^{1, 770}_0
c  in DIMACS:
 3467  3468  3469  769  3470 0
 3467  3468  3469  769 -3471 0
 3467  3468  3469  769  3472 0

c  -1-1 --> -2
c    ( b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧  b^{1, 769}_0 ∧ -p_769) -> ( b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0)
c  in CNF:
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨  b^{1, 770}_2
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨  b^{1, 770}_1
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨  p_769 ∨ -b^{1, 770}_0
c  in DIMACS:
-3467  3468 -3469  769  3470 0
-3467  3468 -3469  769  3471 0
-3467  3468 -3469  769 -3472 0

c  -2-1 --> break 
c    ( b^{1, 769}_2 ∧  b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧ -p_769) -> break
c  in CNF:
c    -b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨  b^{1, 769}_0 ∨  p_769 ∨ break
c  in DIMACS:
-3467 -3468  3469  769 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 769}_2 ∧ -b^{1, 769}_1 ∧ -b^{1, 769}_0 ∧ true) 
c  in CNF:
c    -b^{1, 769}_2 ∨  b^{1, 769}_1 ∨  b^{1, 769}_0 ∨ false 
c  in DIMACS:
-3467  3468  3469  0

c  3 does not represent an automaton state.
c    -(-b^{1, 769}_2 ∧  b^{1, 769}_1 ∧  b^{1, 769}_0 ∧ true) 
c  in CNF:
c     b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ false 
c  in DIMACS:
 3467 -3468 -3469  0
c  -3 does not represent an automaton state.
c    -( b^{1, 769}_2 ∧  b^{1, 769}_1 ∧  b^{1, 769}_0 ∧ true) 
c  in CNF:
c    -b^{1, 769}_2 ∨ -b^{1, 769}_1 ∨ -b^{1, 769}_0 ∨ false 
c  in DIMACS:
-3467 -3468 -3469  0

c i = 770
c  -2+1 --> -1
c    ( b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧  p_770) -> ( b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0)
c  in CNF:
c    -b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨  b^{1, 771}_2
c    -b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_1
c    -b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨  b^{1, 771}_0
c  in DIMACS:
-3470 -3471  3472 -770  3473 0
-3470 -3471  3472 -770 -3474 0
-3470 -3471  3472 -770  3475 0

c  -1+1 --> 0
c    ( b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0 ∧  p_770) -> (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧ -b^{1, 771}_0)
c  in CNF:
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_2
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_1
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_0
c  in DIMACS:
-3470  3471 -3472 -770 -3473 0
-3470  3471 -3472 -770 -3474 0
-3470  3471 -3472 -770 -3475 0

c  0+1 --> 1
c    (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧  p_770) -> (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0)
c  in CNF:
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_2
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_1
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨  b^{1, 771}_0
c  in DIMACS:
 3470  3471  3472 -770 -3473 0
 3470  3471  3472 -770 -3474 0
 3470  3471  3472 -770  3475 0

c  1+1 --> 2
c    (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0 ∧  p_770) -> (-b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0)
c  in CNF:
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_2
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨  b^{1, 771}_1
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ -p_770 ∨ -b^{1, 771}_0
c  in DIMACS:
 3470  3471 -3472 -770 -3473 0
 3470  3471 -3472 -770  3474 0
 3470  3471 -3472 -770 -3475 0

c  2+1 --> break 
c    (-b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧  p_770) -> break
c  in CNF:
c     b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 3470 -3471  3472 -770 1162 0


c  2-1 --> 1
c    (-b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧ -p_770) -> (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0)
c  in CNF:
c     b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_2
c     b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_1
c     b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨  b^{1, 771}_0
c  in DIMACS:
 3470 -3471  3472  770 -3473 0
 3470 -3471  3472  770 -3474 0
 3470 -3471  3472  770  3475 0

c  1-1 --> 0
c    (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0 ∧ -p_770) -> (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧ -b^{1, 771}_0)
c  in CNF:
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_2
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_1
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_0
c  in DIMACS:
 3470  3471 -3472  770 -3473 0
 3470  3471 -3472  770 -3474 0
 3470  3471 -3472  770 -3475 0

c  0-1 --> -1
c    (-b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧ -p_770) -> ( b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0)
c  in CNF:
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨  b^{1, 771}_2
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_1
c     b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨  b^{1, 771}_0
c  in DIMACS:
 3470  3471  3472  770  3473 0
 3470  3471  3472  770 -3474 0
 3470  3471  3472  770  3475 0

c  -1-1 --> -2
c    ( b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧  b^{1, 770}_0 ∧ -p_770) -> ( b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0)
c  in CNF:
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨  b^{1, 771}_2
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨  b^{1, 771}_1
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨  p_770 ∨ -b^{1, 771}_0
c  in DIMACS:
-3470  3471 -3472  770  3473 0
-3470  3471 -3472  770  3474 0
-3470  3471 -3472  770 -3475 0

c  -2-1 --> break 
c    ( b^{1, 770}_2 ∧  b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨  b^{1, 770}_0 ∨  p_770 ∨ break
c  in DIMACS:
-3470 -3471  3472  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 770}_2 ∧ -b^{1, 770}_1 ∧ -b^{1, 770}_0 ∧ true) 
c  in CNF:
c    -b^{1, 770}_2 ∨  b^{1, 770}_1 ∨  b^{1, 770}_0 ∨ false 
c  in DIMACS:
-3470  3471  3472  0

c  3 does not represent an automaton state.
c    -(-b^{1, 770}_2 ∧  b^{1, 770}_1 ∧  b^{1, 770}_0 ∧ true) 
c  in CNF:
c     b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ false 
c  in DIMACS:
 3470 -3471 -3472  0
c  -3 does not represent an automaton state.
c    -( b^{1, 770}_2 ∧  b^{1, 770}_1 ∧  b^{1, 770}_0 ∧ true) 
c  in CNF:
c    -b^{1, 770}_2 ∨ -b^{1, 770}_1 ∨ -b^{1, 770}_0 ∨ false 
c  in DIMACS:
-3470 -3471 -3472  0

c i = 771
c  -2+1 --> -1
c    ( b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧  p_771) -> ( b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0)
c  in CNF:
c    -b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨  b^{1, 772}_2
c    -b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_1
c    -b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨  b^{1, 772}_0
c  in DIMACS:
-3473 -3474  3475 -771  3476 0
-3473 -3474  3475 -771 -3477 0
-3473 -3474  3475 -771  3478 0

c  -1+1 --> 0
c    ( b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0 ∧  p_771) -> (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧ -b^{1, 772}_0)
c  in CNF:
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_2
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_1
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_0
c  in DIMACS:
-3473  3474 -3475 -771 -3476 0
-3473  3474 -3475 -771 -3477 0
-3473  3474 -3475 -771 -3478 0

c  0+1 --> 1
c    (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧  p_771) -> (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0)
c  in CNF:
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_2
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_1
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨  b^{1, 772}_0
c  in DIMACS:
 3473  3474  3475 -771 -3476 0
 3473  3474  3475 -771 -3477 0
 3473  3474  3475 -771  3478 0

c  1+1 --> 2
c    (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0 ∧  p_771) -> (-b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0)
c  in CNF:
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_2
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨  b^{1, 772}_1
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ -p_771 ∨ -b^{1, 772}_0
c  in DIMACS:
 3473  3474 -3475 -771 -3476 0
 3473  3474 -3475 -771  3477 0
 3473  3474 -3475 -771 -3478 0

c  2+1 --> break 
c    (-b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧  p_771) -> break
c  in CNF:
c     b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ -p_771 ∨ break
c  in DIMACS:
 3473 -3474  3475 -771 1162 0


c  2-1 --> 1
c    (-b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧ -p_771) -> (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0)
c  in CNF:
c     b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_2
c     b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_1
c     b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨  b^{1, 772}_0
c  in DIMACS:
 3473 -3474  3475  771 -3476 0
 3473 -3474  3475  771 -3477 0
 3473 -3474  3475  771  3478 0

c  1-1 --> 0
c    (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0 ∧ -p_771) -> (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧ -b^{1, 772}_0)
c  in CNF:
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_2
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_1
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_0
c  in DIMACS:
 3473  3474 -3475  771 -3476 0
 3473  3474 -3475  771 -3477 0
 3473  3474 -3475  771 -3478 0

c  0-1 --> -1
c    (-b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧ -p_771) -> ( b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0)
c  in CNF:
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨  b^{1, 772}_2
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_1
c     b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨  b^{1, 772}_0
c  in DIMACS:
 3473  3474  3475  771  3476 0
 3473  3474  3475  771 -3477 0
 3473  3474  3475  771  3478 0

c  -1-1 --> -2
c    ( b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧  b^{1, 771}_0 ∧ -p_771) -> ( b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0)
c  in CNF:
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨  b^{1, 772}_2
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨  b^{1, 772}_1
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨  p_771 ∨ -b^{1, 772}_0
c  in DIMACS:
-3473  3474 -3475  771  3476 0
-3473  3474 -3475  771  3477 0
-3473  3474 -3475  771 -3478 0

c  -2-1 --> break 
c    ( b^{1, 771}_2 ∧  b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧ -p_771) -> break
c  in CNF:
c    -b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨  b^{1, 771}_0 ∨  p_771 ∨ break
c  in DIMACS:
-3473 -3474  3475  771 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 771}_2 ∧ -b^{1, 771}_1 ∧ -b^{1, 771}_0 ∧ true) 
c  in CNF:
c    -b^{1, 771}_2 ∨  b^{1, 771}_1 ∨  b^{1, 771}_0 ∨ false 
c  in DIMACS:
-3473  3474  3475  0

c  3 does not represent an automaton state.
c    -(-b^{1, 771}_2 ∧  b^{1, 771}_1 ∧  b^{1, 771}_0 ∧ true) 
c  in CNF:
c     b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ false 
c  in DIMACS:
 3473 -3474 -3475  0
c  -3 does not represent an automaton state.
c    -( b^{1, 771}_2 ∧  b^{1, 771}_1 ∧  b^{1, 771}_0 ∧ true) 
c  in CNF:
c    -b^{1, 771}_2 ∨ -b^{1, 771}_1 ∨ -b^{1, 771}_0 ∨ false 
c  in DIMACS:
-3473 -3474 -3475  0

c i = 772
c  -2+1 --> -1
c    ( b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧  p_772) -> ( b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0)
c  in CNF:
c    -b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨  b^{1, 773}_2
c    -b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_1
c    -b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨  b^{1, 773}_0
c  in DIMACS:
-3476 -3477  3478 -772  3479 0
-3476 -3477  3478 -772 -3480 0
-3476 -3477  3478 -772  3481 0

c  -1+1 --> 0
c    ( b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0 ∧  p_772) -> (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧ -b^{1, 773}_0)
c  in CNF:
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_2
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_1
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_0
c  in DIMACS:
-3476  3477 -3478 -772 -3479 0
-3476  3477 -3478 -772 -3480 0
-3476  3477 -3478 -772 -3481 0

c  0+1 --> 1
c    (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧  p_772) -> (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0)
c  in CNF:
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_2
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_1
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨  b^{1, 773}_0
c  in DIMACS:
 3476  3477  3478 -772 -3479 0
 3476  3477  3478 -772 -3480 0
 3476  3477  3478 -772  3481 0

c  1+1 --> 2
c    (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0 ∧  p_772) -> (-b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0)
c  in CNF:
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_2
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨  b^{1, 773}_1
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ -p_772 ∨ -b^{1, 773}_0
c  in DIMACS:
 3476  3477 -3478 -772 -3479 0
 3476  3477 -3478 -772  3480 0
 3476  3477 -3478 -772 -3481 0

c  2+1 --> break 
c    (-b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧  p_772) -> break
c  in CNF:
c     b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ -p_772 ∨ break
c  in DIMACS:
 3476 -3477  3478 -772 1162 0


c  2-1 --> 1
c    (-b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧ -p_772) -> (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0)
c  in CNF:
c     b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_2
c     b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_1
c     b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨  b^{1, 773}_0
c  in DIMACS:
 3476 -3477  3478  772 -3479 0
 3476 -3477  3478  772 -3480 0
 3476 -3477  3478  772  3481 0

c  1-1 --> 0
c    (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0 ∧ -p_772) -> (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧ -b^{1, 773}_0)
c  in CNF:
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_2
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_1
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_0
c  in DIMACS:
 3476  3477 -3478  772 -3479 0
 3476  3477 -3478  772 -3480 0
 3476  3477 -3478  772 -3481 0

c  0-1 --> -1
c    (-b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧ -p_772) -> ( b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0)
c  in CNF:
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨  b^{1, 773}_2
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_1
c     b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨  b^{1, 773}_0
c  in DIMACS:
 3476  3477  3478  772  3479 0
 3476  3477  3478  772 -3480 0
 3476  3477  3478  772  3481 0

c  -1-1 --> -2
c    ( b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧  b^{1, 772}_0 ∧ -p_772) -> ( b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0)
c  in CNF:
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨  b^{1, 773}_2
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨  b^{1, 773}_1
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨  p_772 ∨ -b^{1, 773}_0
c  in DIMACS:
-3476  3477 -3478  772  3479 0
-3476  3477 -3478  772  3480 0
-3476  3477 -3478  772 -3481 0

c  -2-1 --> break 
c    ( b^{1, 772}_2 ∧  b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧ -p_772) -> break
c  in CNF:
c    -b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨  b^{1, 772}_0 ∨  p_772 ∨ break
c  in DIMACS:
-3476 -3477  3478  772 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 772}_2 ∧ -b^{1, 772}_1 ∧ -b^{1, 772}_0 ∧ true) 
c  in CNF:
c    -b^{1, 772}_2 ∨  b^{1, 772}_1 ∨  b^{1, 772}_0 ∨ false 
c  in DIMACS:
-3476  3477  3478  0

c  3 does not represent an automaton state.
c    -(-b^{1, 772}_2 ∧  b^{1, 772}_1 ∧  b^{1, 772}_0 ∧ true) 
c  in CNF:
c     b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ false 
c  in DIMACS:
 3476 -3477 -3478  0
c  -3 does not represent an automaton state.
c    -( b^{1, 772}_2 ∧  b^{1, 772}_1 ∧  b^{1, 772}_0 ∧ true) 
c  in CNF:
c    -b^{1, 772}_2 ∨ -b^{1, 772}_1 ∨ -b^{1, 772}_0 ∨ false 
c  in DIMACS:
-3476 -3477 -3478  0

c i = 773
c  -2+1 --> -1
c    ( b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧  p_773) -> ( b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0)
c  in CNF:
c    -b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨  b^{1, 774}_2
c    -b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_1
c    -b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨  b^{1, 774}_0
c  in DIMACS:
-3479 -3480  3481 -773  3482 0
-3479 -3480  3481 -773 -3483 0
-3479 -3480  3481 -773  3484 0

c  -1+1 --> 0
c    ( b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0 ∧  p_773) -> (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧ -b^{1, 774}_0)
c  in CNF:
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_2
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_1
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_0
c  in DIMACS:
-3479  3480 -3481 -773 -3482 0
-3479  3480 -3481 -773 -3483 0
-3479  3480 -3481 -773 -3484 0

c  0+1 --> 1
c    (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧  p_773) -> (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0)
c  in CNF:
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_2
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_1
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨  b^{1, 774}_0
c  in DIMACS:
 3479  3480  3481 -773 -3482 0
 3479  3480  3481 -773 -3483 0
 3479  3480  3481 -773  3484 0

c  1+1 --> 2
c    (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0 ∧  p_773) -> (-b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0)
c  in CNF:
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_2
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨  b^{1, 774}_1
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ -p_773 ∨ -b^{1, 774}_0
c  in DIMACS:
 3479  3480 -3481 -773 -3482 0
 3479  3480 -3481 -773  3483 0
 3479  3480 -3481 -773 -3484 0

c  2+1 --> break 
c    (-b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧  p_773) -> break
c  in CNF:
c     b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ -p_773 ∨ break
c  in DIMACS:
 3479 -3480  3481 -773 1162 0


c  2-1 --> 1
c    (-b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧ -p_773) -> (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0)
c  in CNF:
c     b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_2
c     b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_1
c     b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨  b^{1, 774}_0
c  in DIMACS:
 3479 -3480  3481  773 -3482 0
 3479 -3480  3481  773 -3483 0
 3479 -3480  3481  773  3484 0

c  1-1 --> 0
c    (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0 ∧ -p_773) -> (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧ -b^{1, 774}_0)
c  in CNF:
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_2
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_1
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_0
c  in DIMACS:
 3479  3480 -3481  773 -3482 0
 3479  3480 -3481  773 -3483 0
 3479  3480 -3481  773 -3484 0

c  0-1 --> -1
c    (-b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧ -p_773) -> ( b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0)
c  in CNF:
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨  b^{1, 774}_2
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_1
c     b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨  b^{1, 774}_0
c  in DIMACS:
 3479  3480  3481  773  3482 0
 3479  3480  3481  773 -3483 0
 3479  3480  3481  773  3484 0

c  -1-1 --> -2
c    ( b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧  b^{1, 773}_0 ∧ -p_773) -> ( b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0)
c  in CNF:
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨  b^{1, 774}_2
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨  b^{1, 774}_1
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨  p_773 ∨ -b^{1, 774}_0
c  in DIMACS:
-3479  3480 -3481  773  3482 0
-3479  3480 -3481  773  3483 0
-3479  3480 -3481  773 -3484 0

c  -2-1 --> break 
c    ( b^{1, 773}_2 ∧  b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧ -p_773) -> break
c  in CNF:
c    -b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨  b^{1, 773}_0 ∨  p_773 ∨ break
c  in DIMACS:
-3479 -3480  3481  773 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 773}_2 ∧ -b^{1, 773}_1 ∧ -b^{1, 773}_0 ∧ true) 
c  in CNF:
c    -b^{1, 773}_2 ∨  b^{1, 773}_1 ∨  b^{1, 773}_0 ∨ false 
c  in DIMACS:
-3479  3480  3481  0

c  3 does not represent an automaton state.
c    -(-b^{1, 773}_2 ∧  b^{1, 773}_1 ∧  b^{1, 773}_0 ∧ true) 
c  in CNF:
c     b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ false 
c  in DIMACS:
 3479 -3480 -3481  0
c  -3 does not represent an automaton state.
c    -( b^{1, 773}_2 ∧  b^{1, 773}_1 ∧  b^{1, 773}_0 ∧ true) 
c  in CNF:
c    -b^{1, 773}_2 ∨ -b^{1, 773}_1 ∨ -b^{1, 773}_0 ∨ false 
c  in DIMACS:
-3479 -3480 -3481  0

c i = 774
c  -2+1 --> -1
c    ( b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧  p_774) -> ( b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0)
c  in CNF:
c    -b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨  b^{1, 775}_2
c    -b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_1
c    -b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨  b^{1, 775}_0
c  in DIMACS:
-3482 -3483  3484 -774  3485 0
-3482 -3483  3484 -774 -3486 0
-3482 -3483  3484 -774  3487 0

c  -1+1 --> 0
c    ( b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0 ∧  p_774) -> (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧ -b^{1, 775}_0)
c  in CNF:
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_2
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_1
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_0
c  in DIMACS:
-3482  3483 -3484 -774 -3485 0
-3482  3483 -3484 -774 -3486 0
-3482  3483 -3484 -774 -3487 0

c  0+1 --> 1
c    (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧  p_774) -> (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0)
c  in CNF:
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_2
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_1
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨  b^{1, 775}_0
c  in DIMACS:
 3482  3483  3484 -774 -3485 0
 3482  3483  3484 -774 -3486 0
 3482  3483  3484 -774  3487 0

c  1+1 --> 2
c    (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0 ∧  p_774) -> (-b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0)
c  in CNF:
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_2
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨  b^{1, 775}_1
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ -p_774 ∨ -b^{1, 775}_0
c  in DIMACS:
 3482  3483 -3484 -774 -3485 0
 3482  3483 -3484 -774  3486 0
 3482  3483 -3484 -774 -3487 0

c  2+1 --> break 
c    (-b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧  p_774) -> break
c  in CNF:
c     b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 3482 -3483  3484 -774 1162 0


c  2-1 --> 1
c    (-b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧ -p_774) -> (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0)
c  in CNF:
c     b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_2
c     b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_1
c     b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨  b^{1, 775}_0
c  in DIMACS:
 3482 -3483  3484  774 -3485 0
 3482 -3483  3484  774 -3486 0
 3482 -3483  3484  774  3487 0

c  1-1 --> 0
c    (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0 ∧ -p_774) -> (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧ -b^{1, 775}_0)
c  in CNF:
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_2
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_1
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_0
c  in DIMACS:
 3482  3483 -3484  774 -3485 0
 3482  3483 -3484  774 -3486 0
 3482  3483 -3484  774 -3487 0

c  0-1 --> -1
c    (-b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧ -p_774) -> ( b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0)
c  in CNF:
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨  b^{1, 775}_2
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_1
c     b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨  b^{1, 775}_0
c  in DIMACS:
 3482  3483  3484  774  3485 0
 3482  3483  3484  774 -3486 0
 3482  3483  3484  774  3487 0

c  -1-1 --> -2
c    ( b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧  b^{1, 774}_0 ∧ -p_774) -> ( b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0)
c  in CNF:
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨  b^{1, 775}_2
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨  b^{1, 775}_1
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨  p_774 ∨ -b^{1, 775}_0
c  in DIMACS:
-3482  3483 -3484  774  3485 0
-3482  3483 -3484  774  3486 0
-3482  3483 -3484  774 -3487 0

c  -2-1 --> break 
c    ( b^{1, 774}_2 ∧  b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨  b^{1, 774}_0 ∨  p_774 ∨ break
c  in DIMACS:
-3482 -3483  3484  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 774}_2 ∧ -b^{1, 774}_1 ∧ -b^{1, 774}_0 ∧ true) 
c  in CNF:
c    -b^{1, 774}_2 ∨  b^{1, 774}_1 ∨  b^{1, 774}_0 ∨ false 
c  in DIMACS:
-3482  3483  3484  0

c  3 does not represent an automaton state.
c    -(-b^{1, 774}_2 ∧  b^{1, 774}_1 ∧  b^{1, 774}_0 ∧ true) 
c  in CNF:
c     b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ false 
c  in DIMACS:
 3482 -3483 -3484  0
c  -3 does not represent an automaton state.
c    -( b^{1, 774}_2 ∧  b^{1, 774}_1 ∧  b^{1, 774}_0 ∧ true) 
c  in CNF:
c    -b^{1, 774}_2 ∨ -b^{1, 774}_1 ∨ -b^{1, 774}_0 ∨ false 
c  in DIMACS:
-3482 -3483 -3484  0

c i = 775
c  -2+1 --> -1
c    ( b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧  p_775) -> ( b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0)
c  in CNF:
c    -b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨  b^{1, 776}_2
c    -b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_1
c    -b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨  b^{1, 776}_0
c  in DIMACS:
-3485 -3486  3487 -775  3488 0
-3485 -3486  3487 -775 -3489 0
-3485 -3486  3487 -775  3490 0

c  -1+1 --> 0
c    ( b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0 ∧  p_775) -> (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧ -b^{1, 776}_0)
c  in CNF:
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_2
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_1
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_0
c  in DIMACS:
-3485  3486 -3487 -775 -3488 0
-3485  3486 -3487 -775 -3489 0
-3485  3486 -3487 -775 -3490 0

c  0+1 --> 1
c    (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧  p_775) -> (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0)
c  in CNF:
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_2
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_1
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨  b^{1, 776}_0
c  in DIMACS:
 3485  3486  3487 -775 -3488 0
 3485  3486  3487 -775 -3489 0
 3485  3486  3487 -775  3490 0

c  1+1 --> 2
c    (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0 ∧  p_775) -> (-b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0)
c  in CNF:
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_2
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨  b^{1, 776}_1
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ -p_775 ∨ -b^{1, 776}_0
c  in DIMACS:
 3485  3486 -3487 -775 -3488 0
 3485  3486 -3487 -775  3489 0
 3485  3486 -3487 -775 -3490 0

c  2+1 --> break 
c    (-b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧  p_775) -> break
c  in CNF:
c     b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ -p_775 ∨ break
c  in DIMACS:
 3485 -3486  3487 -775 1162 0


c  2-1 --> 1
c    (-b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧ -p_775) -> (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0)
c  in CNF:
c     b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_2
c     b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_1
c     b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨  b^{1, 776}_0
c  in DIMACS:
 3485 -3486  3487  775 -3488 0
 3485 -3486  3487  775 -3489 0
 3485 -3486  3487  775  3490 0

c  1-1 --> 0
c    (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0 ∧ -p_775) -> (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧ -b^{1, 776}_0)
c  in CNF:
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_2
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_1
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_0
c  in DIMACS:
 3485  3486 -3487  775 -3488 0
 3485  3486 -3487  775 -3489 0
 3485  3486 -3487  775 -3490 0

c  0-1 --> -1
c    (-b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧ -p_775) -> ( b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0)
c  in CNF:
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨  b^{1, 776}_2
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_1
c     b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨  b^{1, 776}_0
c  in DIMACS:
 3485  3486  3487  775  3488 0
 3485  3486  3487  775 -3489 0
 3485  3486  3487  775  3490 0

c  -1-1 --> -2
c    ( b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧  b^{1, 775}_0 ∧ -p_775) -> ( b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0)
c  in CNF:
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨  b^{1, 776}_2
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨  b^{1, 776}_1
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨  p_775 ∨ -b^{1, 776}_0
c  in DIMACS:
-3485  3486 -3487  775  3488 0
-3485  3486 -3487  775  3489 0
-3485  3486 -3487  775 -3490 0

c  -2-1 --> break 
c    ( b^{1, 775}_2 ∧  b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧ -p_775) -> break
c  in CNF:
c    -b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨  b^{1, 775}_0 ∨  p_775 ∨ break
c  in DIMACS:
-3485 -3486  3487  775 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 775}_2 ∧ -b^{1, 775}_1 ∧ -b^{1, 775}_0 ∧ true) 
c  in CNF:
c    -b^{1, 775}_2 ∨  b^{1, 775}_1 ∨  b^{1, 775}_0 ∨ false 
c  in DIMACS:
-3485  3486  3487  0

c  3 does not represent an automaton state.
c    -(-b^{1, 775}_2 ∧  b^{1, 775}_1 ∧  b^{1, 775}_0 ∧ true) 
c  in CNF:
c     b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ false 
c  in DIMACS:
 3485 -3486 -3487  0
c  -3 does not represent an automaton state.
c    -( b^{1, 775}_2 ∧  b^{1, 775}_1 ∧  b^{1, 775}_0 ∧ true) 
c  in CNF:
c    -b^{1, 775}_2 ∨ -b^{1, 775}_1 ∨ -b^{1, 775}_0 ∨ false 
c  in DIMACS:
-3485 -3486 -3487  0

c i = 776
c  -2+1 --> -1
c    ( b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧  p_776) -> ( b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0)
c  in CNF:
c    -b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨  b^{1, 777}_2
c    -b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_1
c    -b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨  b^{1, 777}_0
c  in DIMACS:
-3488 -3489  3490 -776  3491 0
-3488 -3489  3490 -776 -3492 0
-3488 -3489  3490 -776  3493 0

c  -1+1 --> 0
c    ( b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0 ∧  p_776) -> (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧ -b^{1, 777}_0)
c  in CNF:
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_2
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_1
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_0
c  in DIMACS:
-3488  3489 -3490 -776 -3491 0
-3488  3489 -3490 -776 -3492 0
-3488  3489 -3490 -776 -3493 0

c  0+1 --> 1
c    (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧  p_776) -> (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0)
c  in CNF:
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_2
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_1
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨  b^{1, 777}_0
c  in DIMACS:
 3488  3489  3490 -776 -3491 0
 3488  3489  3490 -776 -3492 0
 3488  3489  3490 -776  3493 0

c  1+1 --> 2
c    (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0 ∧  p_776) -> (-b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0)
c  in CNF:
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_2
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨  b^{1, 777}_1
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ -p_776 ∨ -b^{1, 777}_0
c  in DIMACS:
 3488  3489 -3490 -776 -3491 0
 3488  3489 -3490 -776  3492 0
 3488  3489 -3490 -776 -3493 0

c  2+1 --> break 
c    (-b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧  p_776) -> break
c  in CNF:
c     b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 3488 -3489  3490 -776 1162 0


c  2-1 --> 1
c    (-b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧ -p_776) -> (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0)
c  in CNF:
c     b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_2
c     b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_1
c     b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨  b^{1, 777}_0
c  in DIMACS:
 3488 -3489  3490  776 -3491 0
 3488 -3489  3490  776 -3492 0
 3488 -3489  3490  776  3493 0

c  1-1 --> 0
c    (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0 ∧ -p_776) -> (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧ -b^{1, 777}_0)
c  in CNF:
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_2
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_1
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_0
c  in DIMACS:
 3488  3489 -3490  776 -3491 0
 3488  3489 -3490  776 -3492 0
 3488  3489 -3490  776 -3493 0

c  0-1 --> -1
c    (-b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧ -p_776) -> ( b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0)
c  in CNF:
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨  b^{1, 777}_2
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_1
c     b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨  b^{1, 777}_0
c  in DIMACS:
 3488  3489  3490  776  3491 0
 3488  3489  3490  776 -3492 0
 3488  3489  3490  776  3493 0

c  -1-1 --> -2
c    ( b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧  b^{1, 776}_0 ∧ -p_776) -> ( b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0)
c  in CNF:
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨  b^{1, 777}_2
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨  b^{1, 777}_1
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨  p_776 ∨ -b^{1, 777}_0
c  in DIMACS:
-3488  3489 -3490  776  3491 0
-3488  3489 -3490  776  3492 0
-3488  3489 -3490  776 -3493 0

c  -2-1 --> break 
c    ( b^{1, 776}_2 ∧  b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨  b^{1, 776}_0 ∨  p_776 ∨ break
c  in DIMACS:
-3488 -3489  3490  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 776}_2 ∧ -b^{1, 776}_1 ∧ -b^{1, 776}_0 ∧ true) 
c  in CNF:
c    -b^{1, 776}_2 ∨  b^{1, 776}_1 ∨  b^{1, 776}_0 ∨ false 
c  in DIMACS:
-3488  3489  3490  0

c  3 does not represent an automaton state.
c    -(-b^{1, 776}_2 ∧  b^{1, 776}_1 ∧  b^{1, 776}_0 ∧ true) 
c  in CNF:
c     b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ false 
c  in DIMACS:
 3488 -3489 -3490  0
c  -3 does not represent an automaton state.
c    -( b^{1, 776}_2 ∧  b^{1, 776}_1 ∧  b^{1, 776}_0 ∧ true) 
c  in CNF:
c    -b^{1, 776}_2 ∨ -b^{1, 776}_1 ∨ -b^{1, 776}_0 ∨ false 
c  in DIMACS:
-3488 -3489 -3490  0

c i = 777
c  -2+1 --> -1
c    ( b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧  p_777) -> ( b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0)
c  in CNF:
c    -b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨  b^{1, 778}_2
c    -b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_1
c    -b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨  b^{1, 778}_0
c  in DIMACS:
-3491 -3492  3493 -777  3494 0
-3491 -3492  3493 -777 -3495 0
-3491 -3492  3493 -777  3496 0

c  -1+1 --> 0
c    ( b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0 ∧  p_777) -> (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧ -b^{1, 778}_0)
c  in CNF:
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_2
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_1
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_0
c  in DIMACS:
-3491  3492 -3493 -777 -3494 0
-3491  3492 -3493 -777 -3495 0
-3491  3492 -3493 -777 -3496 0

c  0+1 --> 1
c    (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧  p_777) -> (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0)
c  in CNF:
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_2
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_1
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨  b^{1, 778}_0
c  in DIMACS:
 3491  3492  3493 -777 -3494 0
 3491  3492  3493 -777 -3495 0
 3491  3492  3493 -777  3496 0

c  1+1 --> 2
c    (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0 ∧  p_777) -> (-b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0)
c  in CNF:
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_2
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨  b^{1, 778}_1
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ -p_777 ∨ -b^{1, 778}_0
c  in DIMACS:
 3491  3492 -3493 -777 -3494 0
 3491  3492 -3493 -777  3495 0
 3491  3492 -3493 -777 -3496 0

c  2+1 --> break 
c    (-b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧  p_777) -> break
c  in CNF:
c     b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 3491 -3492  3493 -777 1162 0


c  2-1 --> 1
c    (-b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧ -p_777) -> (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0)
c  in CNF:
c     b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_2
c     b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_1
c     b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨  b^{1, 778}_0
c  in DIMACS:
 3491 -3492  3493  777 -3494 0
 3491 -3492  3493  777 -3495 0
 3491 -3492  3493  777  3496 0

c  1-1 --> 0
c    (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0 ∧ -p_777) -> (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧ -b^{1, 778}_0)
c  in CNF:
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_2
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_1
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_0
c  in DIMACS:
 3491  3492 -3493  777 -3494 0
 3491  3492 -3493  777 -3495 0
 3491  3492 -3493  777 -3496 0

c  0-1 --> -1
c    (-b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧ -p_777) -> ( b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0)
c  in CNF:
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨  b^{1, 778}_2
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_1
c     b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨  b^{1, 778}_0
c  in DIMACS:
 3491  3492  3493  777  3494 0
 3491  3492  3493  777 -3495 0
 3491  3492  3493  777  3496 0

c  -1-1 --> -2
c    ( b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧  b^{1, 777}_0 ∧ -p_777) -> ( b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0)
c  in CNF:
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨  b^{1, 778}_2
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨  b^{1, 778}_1
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨  p_777 ∨ -b^{1, 778}_0
c  in DIMACS:
-3491  3492 -3493  777  3494 0
-3491  3492 -3493  777  3495 0
-3491  3492 -3493  777 -3496 0

c  -2-1 --> break 
c    ( b^{1, 777}_2 ∧  b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨  b^{1, 777}_0 ∨  p_777 ∨ break
c  in DIMACS:
-3491 -3492  3493  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 777}_2 ∧ -b^{1, 777}_1 ∧ -b^{1, 777}_0 ∧ true) 
c  in CNF:
c    -b^{1, 777}_2 ∨  b^{1, 777}_1 ∨  b^{1, 777}_0 ∨ false 
c  in DIMACS:
-3491  3492  3493  0

c  3 does not represent an automaton state.
c    -(-b^{1, 777}_2 ∧  b^{1, 777}_1 ∧  b^{1, 777}_0 ∧ true) 
c  in CNF:
c     b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ false 
c  in DIMACS:
 3491 -3492 -3493  0
c  -3 does not represent an automaton state.
c    -( b^{1, 777}_2 ∧  b^{1, 777}_1 ∧  b^{1, 777}_0 ∧ true) 
c  in CNF:
c    -b^{1, 777}_2 ∨ -b^{1, 777}_1 ∨ -b^{1, 777}_0 ∨ false 
c  in DIMACS:
-3491 -3492 -3493  0

c i = 778
c  -2+1 --> -1
c    ( b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧  p_778) -> ( b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0)
c  in CNF:
c    -b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨  b^{1, 779}_2
c    -b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_1
c    -b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨  b^{1, 779}_0
c  in DIMACS:
-3494 -3495  3496 -778  3497 0
-3494 -3495  3496 -778 -3498 0
-3494 -3495  3496 -778  3499 0

c  -1+1 --> 0
c    ( b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0 ∧  p_778) -> (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧ -b^{1, 779}_0)
c  in CNF:
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_2
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_1
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_0
c  in DIMACS:
-3494  3495 -3496 -778 -3497 0
-3494  3495 -3496 -778 -3498 0
-3494  3495 -3496 -778 -3499 0

c  0+1 --> 1
c    (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧  p_778) -> (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0)
c  in CNF:
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_2
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_1
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨  b^{1, 779}_0
c  in DIMACS:
 3494  3495  3496 -778 -3497 0
 3494  3495  3496 -778 -3498 0
 3494  3495  3496 -778  3499 0

c  1+1 --> 2
c    (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0 ∧  p_778) -> (-b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0)
c  in CNF:
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_2
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨  b^{1, 779}_1
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ -p_778 ∨ -b^{1, 779}_0
c  in DIMACS:
 3494  3495 -3496 -778 -3497 0
 3494  3495 -3496 -778  3498 0
 3494  3495 -3496 -778 -3499 0

c  2+1 --> break 
c    (-b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧  p_778) -> break
c  in CNF:
c     b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ -p_778 ∨ break
c  in DIMACS:
 3494 -3495  3496 -778 1162 0


c  2-1 --> 1
c    (-b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧ -p_778) -> (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0)
c  in CNF:
c     b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_2
c     b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_1
c     b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨  b^{1, 779}_0
c  in DIMACS:
 3494 -3495  3496  778 -3497 0
 3494 -3495  3496  778 -3498 0
 3494 -3495  3496  778  3499 0

c  1-1 --> 0
c    (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0 ∧ -p_778) -> (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧ -b^{1, 779}_0)
c  in CNF:
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_2
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_1
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_0
c  in DIMACS:
 3494  3495 -3496  778 -3497 0
 3494  3495 -3496  778 -3498 0
 3494  3495 -3496  778 -3499 0

c  0-1 --> -1
c    (-b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧ -p_778) -> ( b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0)
c  in CNF:
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨  b^{1, 779}_2
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_1
c     b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨  b^{1, 779}_0
c  in DIMACS:
 3494  3495  3496  778  3497 0
 3494  3495  3496  778 -3498 0
 3494  3495  3496  778  3499 0

c  -1-1 --> -2
c    ( b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧  b^{1, 778}_0 ∧ -p_778) -> ( b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0)
c  in CNF:
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨  b^{1, 779}_2
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨  b^{1, 779}_1
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨  p_778 ∨ -b^{1, 779}_0
c  in DIMACS:
-3494  3495 -3496  778  3497 0
-3494  3495 -3496  778  3498 0
-3494  3495 -3496  778 -3499 0

c  -2-1 --> break 
c    ( b^{1, 778}_2 ∧  b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧ -p_778) -> break
c  in CNF:
c    -b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨  b^{1, 778}_0 ∨  p_778 ∨ break
c  in DIMACS:
-3494 -3495  3496  778 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 778}_2 ∧ -b^{1, 778}_1 ∧ -b^{1, 778}_0 ∧ true) 
c  in CNF:
c    -b^{1, 778}_2 ∨  b^{1, 778}_1 ∨  b^{1, 778}_0 ∨ false 
c  in DIMACS:
-3494  3495  3496  0

c  3 does not represent an automaton state.
c    -(-b^{1, 778}_2 ∧  b^{1, 778}_1 ∧  b^{1, 778}_0 ∧ true) 
c  in CNF:
c     b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ false 
c  in DIMACS:
 3494 -3495 -3496  0
c  -3 does not represent an automaton state.
c    -( b^{1, 778}_2 ∧  b^{1, 778}_1 ∧  b^{1, 778}_0 ∧ true) 
c  in CNF:
c    -b^{1, 778}_2 ∨ -b^{1, 778}_1 ∨ -b^{1, 778}_0 ∨ false 
c  in DIMACS:
-3494 -3495 -3496  0

c i = 779
c  -2+1 --> -1
c    ( b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧  p_779) -> ( b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0)
c  in CNF:
c    -b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨  b^{1, 780}_2
c    -b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_1
c    -b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨  b^{1, 780}_0
c  in DIMACS:
-3497 -3498  3499 -779  3500 0
-3497 -3498  3499 -779 -3501 0
-3497 -3498  3499 -779  3502 0

c  -1+1 --> 0
c    ( b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0 ∧  p_779) -> (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧ -b^{1, 780}_0)
c  in CNF:
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_2
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_1
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_0
c  in DIMACS:
-3497  3498 -3499 -779 -3500 0
-3497  3498 -3499 -779 -3501 0
-3497  3498 -3499 -779 -3502 0

c  0+1 --> 1
c    (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧  p_779) -> (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0)
c  in CNF:
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_2
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_1
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨  b^{1, 780}_0
c  in DIMACS:
 3497  3498  3499 -779 -3500 0
 3497  3498  3499 -779 -3501 0
 3497  3498  3499 -779  3502 0

c  1+1 --> 2
c    (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0 ∧  p_779) -> (-b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0)
c  in CNF:
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_2
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨  b^{1, 780}_1
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ -p_779 ∨ -b^{1, 780}_0
c  in DIMACS:
 3497  3498 -3499 -779 -3500 0
 3497  3498 -3499 -779  3501 0
 3497  3498 -3499 -779 -3502 0

c  2+1 --> break 
c    (-b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧  p_779) -> break
c  in CNF:
c     b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ -p_779 ∨ break
c  in DIMACS:
 3497 -3498  3499 -779 1162 0


c  2-1 --> 1
c    (-b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧ -p_779) -> (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0)
c  in CNF:
c     b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_2
c     b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_1
c     b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨  b^{1, 780}_0
c  in DIMACS:
 3497 -3498  3499  779 -3500 0
 3497 -3498  3499  779 -3501 0
 3497 -3498  3499  779  3502 0

c  1-1 --> 0
c    (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0 ∧ -p_779) -> (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧ -b^{1, 780}_0)
c  in CNF:
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_2
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_1
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_0
c  in DIMACS:
 3497  3498 -3499  779 -3500 0
 3497  3498 -3499  779 -3501 0
 3497  3498 -3499  779 -3502 0

c  0-1 --> -1
c    (-b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧ -p_779) -> ( b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0)
c  in CNF:
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨  b^{1, 780}_2
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_1
c     b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨  b^{1, 780}_0
c  in DIMACS:
 3497  3498  3499  779  3500 0
 3497  3498  3499  779 -3501 0
 3497  3498  3499  779  3502 0

c  -1-1 --> -2
c    ( b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧  b^{1, 779}_0 ∧ -p_779) -> ( b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0)
c  in CNF:
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨  b^{1, 780}_2
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨  b^{1, 780}_1
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨  p_779 ∨ -b^{1, 780}_0
c  in DIMACS:
-3497  3498 -3499  779  3500 0
-3497  3498 -3499  779  3501 0
-3497  3498 -3499  779 -3502 0

c  -2-1 --> break 
c    ( b^{1, 779}_2 ∧  b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧ -p_779) -> break
c  in CNF:
c    -b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨  b^{1, 779}_0 ∨  p_779 ∨ break
c  in DIMACS:
-3497 -3498  3499  779 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 779}_2 ∧ -b^{1, 779}_1 ∧ -b^{1, 779}_0 ∧ true) 
c  in CNF:
c    -b^{1, 779}_2 ∨  b^{1, 779}_1 ∨  b^{1, 779}_0 ∨ false 
c  in DIMACS:
-3497  3498  3499  0

c  3 does not represent an automaton state.
c    -(-b^{1, 779}_2 ∧  b^{1, 779}_1 ∧  b^{1, 779}_0 ∧ true) 
c  in CNF:
c     b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ false 
c  in DIMACS:
 3497 -3498 -3499  0
c  -3 does not represent an automaton state.
c    -( b^{1, 779}_2 ∧  b^{1, 779}_1 ∧  b^{1, 779}_0 ∧ true) 
c  in CNF:
c    -b^{1, 779}_2 ∨ -b^{1, 779}_1 ∨ -b^{1, 779}_0 ∨ false 
c  in DIMACS:
-3497 -3498 -3499  0

c i = 780
c  -2+1 --> -1
c    ( b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧  p_780) -> ( b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0)
c  in CNF:
c    -b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨  b^{1, 781}_2
c    -b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_1
c    -b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨  b^{1, 781}_0
c  in DIMACS:
-3500 -3501  3502 -780  3503 0
-3500 -3501  3502 -780 -3504 0
-3500 -3501  3502 -780  3505 0

c  -1+1 --> 0
c    ( b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0 ∧  p_780) -> (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧ -b^{1, 781}_0)
c  in CNF:
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_2
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_1
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_0
c  in DIMACS:
-3500  3501 -3502 -780 -3503 0
-3500  3501 -3502 -780 -3504 0
-3500  3501 -3502 -780 -3505 0

c  0+1 --> 1
c    (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧  p_780) -> (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0)
c  in CNF:
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_2
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_1
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨  b^{1, 781}_0
c  in DIMACS:
 3500  3501  3502 -780 -3503 0
 3500  3501  3502 -780 -3504 0
 3500  3501  3502 -780  3505 0

c  1+1 --> 2
c    (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0 ∧  p_780) -> (-b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0)
c  in CNF:
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_2
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨  b^{1, 781}_1
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ -p_780 ∨ -b^{1, 781}_0
c  in DIMACS:
 3500  3501 -3502 -780 -3503 0
 3500  3501 -3502 -780  3504 0
 3500  3501 -3502 -780 -3505 0

c  2+1 --> break 
c    (-b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧  p_780) -> break
c  in CNF:
c     b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 3500 -3501  3502 -780 1162 0


c  2-1 --> 1
c    (-b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧ -p_780) -> (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0)
c  in CNF:
c     b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_2
c     b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_1
c     b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨  b^{1, 781}_0
c  in DIMACS:
 3500 -3501  3502  780 -3503 0
 3500 -3501  3502  780 -3504 0
 3500 -3501  3502  780  3505 0

c  1-1 --> 0
c    (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0 ∧ -p_780) -> (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧ -b^{1, 781}_0)
c  in CNF:
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_2
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_1
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_0
c  in DIMACS:
 3500  3501 -3502  780 -3503 0
 3500  3501 -3502  780 -3504 0
 3500  3501 -3502  780 -3505 0

c  0-1 --> -1
c    (-b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧ -p_780) -> ( b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0)
c  in CNF:
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨  b^{1, 781}_2
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_1
c     b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨  b^{1, 781}_0
c  in DIMACS:
 3500  3501  3502  780  3503 0
 3500  3501  3502  780 -3504 0
 3500  3501  3502  780  3505 0

c  -1-1 --> -2
c    ( b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧  b^{1, 780}_0 ∧ -p_780) -> ( b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0)
c  in CNF:
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨  b^{1, 781}_2
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨  b^{1, 781}_1
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨  p_780 ∨ -b^{1, 781}_0
c  in DIMACS:
-3500  3501 -3502  780  3503 0
-3500  3501 -3502  780  3504 0
-3500  3501 -3502  780 -3505 0

c  -2-1 --> break 
c    ( b^{1, 780}_2 ∧  b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨  b^{1, 780}_0 ∨  p_780 ∨ break
c  in DIMACS:
-3500 -3501  3502  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 780}_2 ∧ -b^{1, 780}_1 ∧ -b^{1, 780}_0 ∧ true) 
c  in CNF:
c    -b^{1, 780}_2 ∨  b^{1, 780}_1 ∨  b^{1, 780}_0 ∨ false 
c  in DIMACS:
-3500  3501  3502  0

c  3 does not represent an automaton state.
c    -(-b^{1, 780}_2 ∧  b^{1, 780}_1 ∧  b^{1, 780}_0 ∧ true) 
c  in CNF:
c     b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ false 
c  in DIMACS:
 3500 -3501 -3502  0
c  -3 does not represent an automaton state.
c    -( b^{1, 780}_2 ∧  b^{1, 780}_1 ∧  b^{1, 780}_0 ∧ true) 
c  in CNF:
c    -b^{1, 780}_2 ∨ -b^{1, 780}_1 ∨ -b^{1, 780}_0 ∨ false 
c  in DIMACS:
-3500 -3501 -3502  0

c i = 781
c  -2+1 --> -1
c    ( b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧  p_781) -> ( b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0)
c  in CNF:
c    -b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨  b^{1, 782}_2
c    -b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_1
c    -b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨  b^{1, 782}_0
c  in DIMACS:
-3503 -3504  3505 -781  3506 0
-3503 -3504  3505 -781 -3507 0
-3503 -3504  3505 -781  3508 0

c  -1+1 --> 0
c    ( b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0 ∧  p_781) -> (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧ -b^{1, 782}_0)
c  in CNF:
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_2
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_1
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_0
c  in DIMACS:
-3503  3504 -3505 -781 -3506 0
-3503  3504 -3505 -781 -3507 0
-3503  3504 -3505 -781 -3508 0

c  0+1 --> 1
c    (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧  p_781) -> (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0)
c  in CNF:
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_2
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_1
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨  b^{1, 782}_0
c  in DIMACS:
 3503  3504  3505 -781 -3506 0
 3503  3504  3505 -781 -3507 0
 3503  3504  3505 -781  3508 0

c  1+1 --> 2
c    (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0 ∧  p_781) -> (-b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0)
c  in CNF:
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_2
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨  b^{1, 782}_1
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ -p_781 ∨ -b^{1, 782}_0
c  in DIMACS:
 3503  3504 -3505 -781 -3506 0
 3503  3504 -3505 -781  3507 0
 3503  3504 -3505 -781 -3508 0

c  2+1 --> break 
c    (-b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧  p_781) -> break
c  in CNF:
c     b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ -p_781 ∨ break
c  in DIMACS:
 3503 -3504  3505 -781 1162 0


c  2-1 --> 1
c    (-b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧ -p_781) -> (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0)
c  in CNF:
c     b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_2
c     b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_1
c     b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨  b^{1, 782}_0
c  in DIMACS:
 3503 -3504  3505  781 -3506 0
 3503 -3504  3505  781 -3507 0
 3503 -3504  3505  781  3508 0

c  1-1 --> 0
c    (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0 ∧ -p_781) -> (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧ -b^{1, 782}_0)
c  in CNF:
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_2
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_1
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_0
c  in DIMACS:
 3503  3504 -3505  781 -3506 0
 3503  3504 -3505  781 -3507 0
 3503  3504 -3505  781 -3508 0

c  0-1 --> -1
c    (-b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧ -p_781) -> ( b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0)
c  in CNF:
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨  b^{1, 782}_2
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_1
c     b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨  b^{1, 782}_0
c  in DIMACS:
 3503  3504  3505  781  3506 0
 3503  3504  3505  781 -3507 0
 3503  3504  3505  781  3508 0

c  -1-1 --> -2
c    ( b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧  b^{1, 781}_0 ∧ -p_781) -> ( b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0)
c  in CNF:
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨  b^{1, 782}_2
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨  b^{1, 782}_1
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨  p_781 ∨ -b^{1, 782}_0
c  in DIMACS:
-3503  3504 -3505  781  3506 0
-3503  3504 -3505  781  3507 0
-3503  3504 -3505  781 -3508 0

c  -2-1 --> break 
c    ( b^{1, 781}_2 ∧  b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧ -p_781) -> break
c  in CNF:
c    -b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨  b^{1, 781}_0 ∨  p_781 ∨ break
c  in DIMACS:
-3503 -3504  3505  781 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 781}_2 ∧ -b^{1, 781}_1 ∧ -b^{1, 781}_0 ∧ true) 
c  in CNF:
c    -b^{1, 781}_2 ∨  b^{1, 781}_1 ∨  b^{1, 781}_0 ∨ false 
c  in DIMACS:
-3503  3504  3505  0

c  3 does not represent an automaton state.
c    -(-b^{1, 781}_2 ∧  b^{1, 781}_1 ∧  b^{1, 781}_0 ∧ true) 
c  in CNF:
c     b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ false 
c  in DIMACS:
 3503 -3504 -3505  0
c  -3 does not represent an automaton state.
c    -( b^{1, 781}_2 ∧  b^{1, 781}_1 ∧  b^{1, 781}_0 ∧ true) 
c  in CNF:
c    -b^{1, 781}_2 ∨ -b^{1, 781}_1 ∨ -b^{1, 781}_0 ∨ false 
c  in DIMACS:
-3503 -3504 -3505  0

c i = 782
c  -2+1 --> -1
c    ( b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧  p_782) -> ( b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0)
c  in CNF:
c    -b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨  b^{1, 783}_2
c    -b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_1
c    -b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨  b^{1, 783}_0
c  in DIMACS:
-3506 -3507  3508 -782  3509 0
-3506 -3507  3508 -782 -3510 0
-3506 -3507  3508 -782  3511 0

c  -1+1 --> 0
c    ( b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0 ∧  p_782) -> (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧ -b^{1, 783}_0)
c  in CNF:
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_2
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_1
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_0
c  in DIMACS:
-3506  3507 -3508 -782 -3509 0
-3506  3507 -3508 -782 -3510 0
-3506  3507 -3508 -782 -3511 0

c  0+1 --> 1
c    (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧  p_782) -> (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0)
c  in CNF:
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_2
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_1
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨  b^{1, 783}_0
c  in DIMACS:
 3506  3507  3508 -782 -3509 0
 3506  3507  3508 -782 -3510 0
 3506  3507  3508 -782  3511 0

c  1+1 --> 2
c    (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0 ∧  p_782) -> (-b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0)
c  in CNF:
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_2
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨  b^{1, 783}_1
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ -p_782 ∨ -b^{1, 783}_0
c  in DIMACS:
 3506  3507 -3508 -782 -3509 0
 3506  3507 -3508 -782  3510 0
 3506  3507 -3508 -782 -3511 0

c  2+1 --> break 
c    (-b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧  p_782) -> break
c  in CNF:
c     b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 3506 -3507  3508 -782 1162 0


c  2-1 --> 1
c    (-b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧ -p_782) -> (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0)
c  in CNF:
c     b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_2
c     b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_1
c     b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨  b^{1, 783}_0
c  in DIMACS:
 3506 -3507  3508  782 -3509 0
 3506 -3507  3508  782 -3510 0
 3506 -3507  3508  782  3511 0

c  1-1 --> 0
c    (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0 ∧ -p_782) -> (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧ -b^{1, 783}_0)
c  in CNF:
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_2
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_1
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_0
c  in DIMACS:
 3506  3507 -3508  782 -3509 0
 3506  3507 -3508  782 -3510 0
 3506  3507 -3508  782 -3511 0

c  0-1 --> -1
c    (-b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧ -p_782) -> ( b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0)
c  in CNF:
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨  b^{1, 783}_2
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_1
c     b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨  b^{1, 783}_0
c  in DIMACS:
 3506  3507  3508  782  3509 0
 3506  3507  3508  782 -3510 0
 3506  3507  3508  782  3511 0

c  -1-1 --> -2
c    ( b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧  b^{1, 782}_0 ∧ -p_782) -> ( b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0)
c  in CNF:
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨  b^{1, 783}_2
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨  b^{1, 783}_1
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨  p_782 ∨ -b^{1, 783}_0
c  in DIMACS:
-3506  3507 -3508  782  3509 0
-3506  3507 -3508  782  3510 0
-3506  3507 -3508  782 -3511 0

c  -2-1 --> break 
c    ( b^{1, 782}_2 ∧  b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨  b^{1, 782}_0 ∨  p_782 ∨ break
c  in DIMACS:
-3506 -3507  3508  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 782}_2 ∧ -b^{1, 782}_1 ∧ -b^{1, 782}_0 ∧ true) 
c  in CNF:
c    -b^{1, 782}_2 ∨  b^{1, 782}_1 ∨  b^{1, 782}_0 ∨ false 
c  in DIMACS:
-3506  3507  3508  0

c  3 does not represent an automaton state.
c    -(-b^{1, 782}_2 ∧  b^{1, 782}_1 ∧  b^{1, 782}_0 ∧ true) 
c  in CNF:
c     b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ false 
c  in DIMACS:
 3506 -3507 -3508  0
c  -3 does not represent an automaton state.
c    -( b^{1, 782}_2 ∧  b^{1, 782}_1 ∧  b^{1, 782}_0 ∧ true) 
c  in CNF:
c    -b^{1, 782}_2 ∨ -b^{1, 782}_1 ∨ -b^{1, 782}_0 ∨ false 
c  in DIMACS:
-3506 -3507 -3508  0

c i = 783
c  -2+1 --> -1
c    ( b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧  p_783) -> ( b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0)
c  in CNF:
c    -b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨  b^{1, 784}_2
c    -b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_1
c    -b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨  b^{1, 784}_0
c  in DIMACS:
-3509 -3510  3511 -783  3512 0
-3509 -3510  3511 -783 -3513 0
-3509 -3510  3511 -783  3514 0

c  -1+1 --> 0
c    ( b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0 ∧  p_783) -> (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧ -b^{1, 784}_0)
c  in CNF:
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_2
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_1
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_0
c  in DIMACS:
-3509  3510 -3511 -783 -3512 0
-3509  3510 -3511 -783 -3513 0
-3509  3510 -3511 -783 -3514 0

c  0+1 --> 1
c    (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧  p_783) -> (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0)
c  in CNF:
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_2
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_1
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨  b^{1, 784}_0
c  in DIMACS:
 3509  3510  3511 -783 -3512 0
 3509  3510  3511 -783 -3513 0
 3509  3510  3511 -783  3514 0

c  1+1 --> 2
c    (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0 ∧  p_783) -> (-b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0)
c  in CNF:
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_2
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨  b^{1, 784}_1
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ -p_783 ∨ -b^{1, 784}_0
c  in DIMACS:
 3509  3510 -3511 -783 -3512 0
 3509  3510 -3511 -783  3513 0
 3509  3510 -3511 -783 -3514 0

c  2+1 --> break 
c    (-b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧  p_783) -> break
c  in CNF:
c     b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 3509 -3510  3511 -783 1162 0


c  2-1 --> 1
c    (-b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧ -p_783) -> (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0)
c  in CNF:
c     b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_2
c     b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_1
c     b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨  b^{1, 784}_0
c  in DIMACS:
 3509 -3510  3511  783 -3512 0
 3509 -3510  3511  783 -3513 0
 3509 -3510  3511  783  3514 0

c  1-1 --> 0
c    (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0 ∧ -p_783) -> (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧ -b^{1, 784}_0)
c  in CNF:
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_2
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_1
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_0
c  in DIMACS:
 3509  3510 -3511  783 -3512 0
 3509  3510 -3511  783 -3513 0
 3509  3510 -3511  783 -3514 0

c  0-1 --> -1
c    (-b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧ -p_783) -> ( b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0)
c  in CNF:
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨  b^{1, 784}_2
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_1
c     b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨  b^{1, 784}_0
c  in DIMACS:
 3509  3510  3511  783  3512 0
 3509  3510  3511  783 -3513 0
 3509  3510  3511  783  3514 0

c  -1-1 --> -2
c    ( b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧  b^{1, 783}_0 ∧ -p_783) -> ( b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0)
c  in CNF:
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨  b^{1, 784}_2
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨  b^{1, 784}_1
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨  p_783 ∨ -b^{1, 784}_0
c  in DIMACS:
-3509  3510 -3511  783  3512 0
-3509  3510 -3511  783  3513 0
-3509  3510 -3511  783 -3514 0

c  -2-1 --> break 
c    ( b^{1, 783}_2 ∧  b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨  b^{1, 783}_0 ∨  p_783 ∨ break
c  in DIMACS:
-3509 -3510  3511  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 783}_2 ∧ -b^{1, 783}_1 ∧ -b^{1, 783}_0 ∧ true) 
c  in CNF:
c    -b^{1, 783}_2 ∨  b^{1, 783}_1 ∨  b^{1, 783}_0 ∨ false 
c  in DIMACS:
-3509  3510  3511  0

c  3 does not represent an automaton state.
c    -(-b^{1, 783}_2 ∧  b^{1, 783}_1 ∧  b^{1, 783}_0 ∧ true) 
c  in CNF:
c     b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ false 
c  in DIMACS:
 3509 -3510 -3511  0
c  -3 does not represent an automaton state.
c    -( b^{1, 783}_2 ∧  b^{1, 783}_1 ∧  b^{1, 783}_0 ∧ true) 
c  in CNF:
c    -b^{1, 783}_2 ∨ -b^{1, 783}_1 ∨ -b^{1, 783}_0 ∨ false 
c  in DIMACS:
-3509 -3510 -3511  0

c i = 784
c  -2+1 --> -1
c    ( b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧  p_784) -> ( b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0)
c  in CNF:
c    -b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨  b^{1, 785}_2
c    -b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_1
c    -b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨  b^{1, 785}_0
c  in DIMACS:
-3512 -3513  3514 -784  3515 0
-3512 -3513  3514 -784 -3516 0
-3512 -3513  3514 -784  3517 0

c  -1+1 --> 0
c    ( b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0 ∧  p_784) -> (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧ -b^{1, 785}_0)
c  in CNF:
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_2
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_1
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_0
c  in DIMACS:
-3512  3513 -3514 -784 -3515 0
-3512  3513 -3514 -784 -3516 0
-3512  3513 -3514 -784 -3517 0

c  0+1 --> 1
c    (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧  p_784) -> (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0)
c  in CNF:
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_2
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_1
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨  b^{1, 785}_0
c  in DIMACS:
 3512  3513  3514 -784 -3515 0
 3512  3513  3514 -784 -3516 0
 3512  3513  3514 -784  3517 0

c  1+1 --> 2
c    (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0 ∧  p_784) -> (-b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0)
c  in CNF:
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_2
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨  b^{1, 785}_1
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ -p_784 ∨ -b^{1, 785}_0
c  in DIMACS:
 3512  3513 -3514 -784 -3515 0
 3512  3513 -3514 -784  3516 0
 3512  3513 -3514 -784 -3517 0

c  2+1 --> break 
c    (-b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧  p_784) -> break
c  in CNF:
c     b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 3512 -3513  3514 -784 1162 0


c  2-1 --> 1
c    (-b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧ -p_784) -> (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0)
c  in CNF:
c     b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_2
c     b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_1
c     b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨  b^{1, 785}_0
c  in DIMACS:
 3512 -3513  3514  784 -3515 0
 3512 -3513  3514  784 -3516 0
 3512 -3513  3514  784  3517 0

c  1-1 --> 0
c    (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0 ∧ -p_784) -> (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧ -b^{1, 785}_0)
c  in CNF:
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_2
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_1
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_0
c  in DIMACS:
 3512  3513 -3514  784 -3515 0
 3512  3513 -3514  784 -3516 0
 3512  3513 -3514  784 -3517 0

c  0-1 --> -1
c    (-b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧ -p_784) -> ( b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0)
c  in CNF:
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨  b^{1, 785}_2
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_1
c     b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨  b^{1, 785}_0
c  in DIMACS:
 3512  3513  3514  784  3515 0
 3512  3513  3514  784 -3516 0
 3512  3513  3514  784  3517 0

c  -1-1 --> -2
c    ( b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧  b^{1, 784}_0 ∧ -p_784) -> ( b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0)
c  in CNF:
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨  b^{1, 785}_2
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨  b^{1, 785}_1
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨  p_784 ∨ -b^{1, 785}_0
c  in DIMACS:
-3512  3513 -3514  784  3515 0
-3512  3513 -3514  784  3516 0
-3512  3513 -3514  784 -3517 0

c  -2-1 --> break 
c    ( b^{1, 784}_2 ∧  b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨  b^{1, 784}_0 ∨  p_784 ∨ break
c  in DIMACS:
-3512 -3513  3514  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 784}_2 ∧ -b^{1, 784}_1 ∧ -b^{1, 784}_0 ∧ true) 
c  in CNF:
c    -b^{1, 784}_2 ∨  b^{1, 784}_1 ∨  b^{1, 784}_0 ∨ false 
c  in DIMACS:
-3512  3513  3514  0

c  3 does not represent an automaton state.
c    -(-b^{1, 784}_2 ∧  b^{1, 784}_1 ∧  b^{1, 784}_0 ∧ true) 
c  in CNF:
c     b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ false 
c  in DIMACS:
 3512 -3513 -3514  0
c  -3 does not represent an automaton state.
c    -( b^{1, 784}_2 ∧  b^{1, 784}_1 ∧  b^{1, 784}_0 ∧ true) 
c  in CNF:
c    -b^{1, 784}_2 ∨ -b^{1, 784}_1 ∨ -b^{1, 784}_0 ∨ false 
c  in DIMACS:
-3512 -3513 -3514  0

c i = 785
c  -2+1 --> -1
c    ( b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧  p_785) -> ( b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0)
c  in CNF:
c    -b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨  b^{1, 786}_2
c    -b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_1
c    -b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨  b^{1, 786}_0
c  in DIMACS:
-3515 -3516  3517 -785  3518 0
-3515 -3516  3517 -785 -3519 0
-3515 -3516  3517 -785  3520 0

c  -1+1 --> 0
c    ( b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0 ∧  p_785) -> (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧ -b^{1, 786}_0)
c  in CNF:
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_2
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_1
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_0
c  in DIMACS:
-3515  3516 -3517 -785 -3518 0
-3515  3516 -3517 -785 -3519 0
-3515  3516 -3517 -785 -3520 0

c  0+1 --> 1
c    (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧  p_785) -> (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0)
c  in CNF:
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_2
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_1
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨  b^{1, 786}_0
c  in DIMACS:
 3515  3516  3517 -785 -3518 0
 3515  3516  3517 -785 -3519 0
 3515  3516  3517 -785  3520 0

c  1+1 --> 2
c    (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0 ∧  p_785) -> (-b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0)
c  in CNF:
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_2
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨  b^{1, 786}_1
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ -p_785 ∨ -b^{1, 786}_0
c  in DIMACS:
 3515  3516 -3517 -785 -3518 0
 3515  3516 -3517 -785  3519 0
 3515  3516 -3517 -785 -3520 0

c  2+1 --> break 
c    (-b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧  p_785) -> break
c  in CNF:
c     b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ -p_785 ∨ break
c  in DIMACS:
 3515 -3516  3517 -785 1162 0


c  2-1 --> 1
c    (-b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧ -p_785) -> (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0)
c  in CNF:
c     b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_2
c     b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_1
c     b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨  b^{1, 786}_0
c  in DIMACS:
 3515 -3516  3517  785 -3518 0
 3515 -3516  3517  785 -3519 0
 3515 -3516  3517  785  3520 0

c  1-1 --> 0
c    (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0 ∧ -p_785) -> (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧ -b^{1, 786}_0)
c  in CNF:
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_2
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_1
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_0
c  in DIMACS:
 3515  3516 -3517  785 -3518 0
 3515  3516 -3517  785 -3519 0
 3515  3516 -3517  785 -3520 0

c  0-1 --> -1
c    (-b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧ -p_785) -> ( b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0)
c  in CNF:
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨  b^{1, 786}_2
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_1
c     b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨  b^{1, 786}_0
c  in DIMACS:
 3515  3516  3517  785  3518 0
 3515  3516  3517  785 -3519 0
 3515  3516  3517  785  3520 0

c  -1-1 --> -2
c    ( b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧  b^{1, 785}_0 ∧ -p_785) -> ( b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0)
c  in CNF:
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨  b^{1, 786}_2
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨  b^{1, 786}_1
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨  p_785 ∨ -b^{1, 786}_0
c  in DIMACS:
-3515  3516 -3517  785  3518 0
-3515  3516 -3517  785  3519 0
-3515  3516 -3517  785 -3520 0

c  -2-1 --> break 
c    ( b^{1, 785}_2 ∧  b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧ -p_785) -> break
c  in CNF:
c    -b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨  b^{1, 785}_0 ∨  p_785 ∨ break
c  in DIMACS:
-3515 -3516  3517  785 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 785}_2 ∧ -b^{1, 785}_1 ∧ -b^{1, 785}_0 ∧ true) 
c  in CNF:
c    -b^{1, 785}_2 ∨  b^{1, 785}_1 ∨  b^{1, 785}_0 ∨ false 
c  in DIMACS:
-3515  3516  3517  0

c  3 does not represent an automaton state.
c    -(-b^{1, 785}_2 ∧  b^{1, 785}_1 ∧  b^{1, 785}_0 ∧ true) 
c  in CNF:
c     b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ false 
c  in DIMACS:
 3515 -3516 -3517  0
c  -3 does not represent an automaton state.
c    -( b^{1, 785}_2 ∧  b^{1, 785}_1 ∧  b^{1, 785}_0 ∧ true) 
c  in CNF:
c    -b^{1, 785}_2 ∨ -b^{1, 785}_1 ∨ -b^{1, 785}_0 ∨ false 
c  in DIMACS:
-3515 -3516 -3517  0

c i = 786
c  -2+1 --> -1
c    ( b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧  p_786) -> ( b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0)
c  in CNF:
c    -b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨  b^{1, 787}_2
c    -b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_1
c    -b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨  b^{1, 787}_0
c  in DIMACS:
-3518 -3519  3520 -786  3521 0
-3518 -3519  3520 -786 -3522 0
-3518 -3519  3520 -786  3523 0

c  -1+1 --> 0
c    ( b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0 ∧  p_786) -> (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧ -b^{1, 787}_0)
c  in CNF:
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_2
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_1
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_0
c  in DIMACS:
-3518  3519 -3520 -786 -3521 0
-3518  3519 -3520 -786 -3522 0
-3518  3519 -3520 -786 -3523 0

c  0+1 --> 1
c    (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧  p_786) -> (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0)
c  in CNF:
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_2
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_1
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨  b^{1, 787}_0
c  in DIMACS:
 3518  3519  3520 -786 -3521 0
 3518  3519  3520 -786 -3522 0
 3518  3519  3520 -786  3523 0

c  1+1 --> 2
c    (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0 ∧  p_786) -> (-b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0)
c  in CNF:
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_2
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨  b^{1, 787}_1
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ -p_786 ∨ -b^{1, 787}_0
c  in DIMACS:
 3518  3519 -3520 -786 -3521 0
 3518  3519 -3520 -786  3522 0
 3518  3519 -3520 -786 -3523 0

c  2+1 --> break 
c    (-b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧  p_786) -> break
c  in CNF:
c     b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 3518 -3519  3520 -786 1162 0


c  2-1 --> 1
c    (-b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧ -p_786) -> (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0)
c  in CNF:
c     b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_2
c     b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_1
c     b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨  b^{1, 787}_0
c  in DIMACS:
 3518 -3519  3520  786 -3521 0
 3518 -3519  3520  786 -3522 0
 3518 -3519  3520  786  3523 0

c  1-1 --> 0
c    (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0 ∧ -p_786) -> (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧ -b^{1, 787}_0)
c  in CNF:
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_2
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_1
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_0
c  in DIMACS:
 3518  3519 -3520  786 -3521 0
 3518  3519 -3520  786 -3522 0
 3518  3519 -3520  786 -3523 0

c  0-1 --> -1
c    (-b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧ -p_786) -> ( b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0)
c  in CNF:
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨  b^{1, 787}_2
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_1
c     b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨  b^{1, 787}_0
c  in DIMACS:
 3518  3519  3520  786  3521 0
 3518  3519  3520  786 -3522 0
 3518  3519  3520  786  3523 0

c  -1-1 --> -2
c    ( b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧  b^{1, 786}_0 ∧ -p_786) -> ( b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0)
c  in CNF:
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨  b^{1, 787}_2
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨  b^{1, 787}_1
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨  p_786 ∨ -b^{1, 787}_0
c  in DIMACS:
-3518  3519 -3520  786  3521 0
-3518  3519 -3520  786  3522 0
-3518  3519 -3520  786 -3523 0

c  -2-1 --> break 
c    ( b^{1, 786}_2 ∧  b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨  b^{1, 786}_0 ∨  p_786 ∨ break
c  in DIMACS:
-3518 -3519  3520  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 786}_2 ∧ -b^{1, 786}_1 ∧ -b^{1, 786}_0 ∧ true) 
c  in CNF:
c    -b^{1, 786}_2 ∨  b^{1, 786}_1 ∨  b^{1, 786}_0 ∨ false 
c  in DIMACS:
-3518  3519  3520  0

c  3 does not represent an automaton state.
c    -(-b^{1, 786}_2 ∧  b^{1, 786}_1 ∧  b^{1, 786}_0 ∧ true) 
c  in CNF:
c     b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ false 
c  in DIMACS:
 3518 -3519 -3520  0
c  -3 does not represent an automaton state.
c    -( b^{1, 786}_2 ∧  b^{1, 786}_1 ∧  b^{1, 786}_0 ∧ true) 
c  in CNF:
c    -b^{1, 786}_2 ∨ -b^{1, 786}_1 ∨ -b^{1, 786}_0 ∨ false 
c  in DIMACS:
-3518 -3519 -3520  0

c i = 787
c  -2+1 --> -1
c    ( b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧  p_787) -> ( b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0)
c  in CNF:
c    -b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨  b^{1, 788}_2
c    -b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_1
c    -b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨  b^{1, 788}_0
c  in DIMACS:
-3521 -3522  3523 -787  3524 0
-3521 -3522  3523 -787 -3525 0
-3521 -3522  3523 -787  3526 0

c  -1+1 --> 0
c    ( b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0 ∧  p_787) -> (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧ -b^{1, 788}_0)
c  in CNF:
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_2
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_1
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_0
c  in DIMACS:
-3521  3522 -3523 -787 -3524 0
-3521  3522 -3523 -787 -3525 0
-3521  3522 -3523 -787 -3526 0

c  0+1 --> 1
c    (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧  p_787) -> (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0)
c  in CNF:
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_2
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_1
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨  b^{1, 788}_0
c  in DIMACS:
 3521  3522  3523 -787 -3524 0
 3521  3522  3523 -787 -3525 0
 3521  3522  3523 -787  3526 0

c  1+1 --> 2
c    (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0 ∧  p_787) -> (-b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0)
c  in CNF:
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_2
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨  b^{1, 788}_1
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ -p_787 ∨ -b^{1, 788}_0
c  in DIMACS:
 3521  3522 -3523 -787 -3524 0
 3521  3522 -3523 -787  3525 0
 3521  3522 -3523 -787 -3526 0

c  2+1 --> break 
c    (-b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧  p_787) -> break
c  in CNF:
c     b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ -p_787 ∨ break
c  in DIMACS:
 3521 -3522  3523 -787 1162 0


c  2-1 --> 1
c    (-b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧ -p_787) -> (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0)
c  in CNF:
c     b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_2
c     b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_1
c     b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨  b^{1, 788}_0
c  in DIMACS:
 3521 -3522  3523  787 -3524 0
 3521 -3522  3523  787 -3525 0
 3521 -3522  3523  787  3526 0

c  1-1 --> 0
c    (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0 ∧ -p_787) -> (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧ -b^{1, 788}_0)
c  in CNF:
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_2
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_1
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_0
c  in DIMACS:
 3521  3522 -3523  787 -3524 0
 3521  3522 -3523  787 -3525 0
 3521  3522 -3523  787 -3526 0

c  0-1 --> -1
c    (-b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧ -p_787) -> ( b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0)
c  in CNF:
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨  b^{1, 788}_2
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_1
c     b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨  b^{1, 788}_0
c  in DIMACS:
 3521  3522  3523  787  3524 0
 3521  3522  3523  787 -3525 0
 3521  3522  3523  787  3526 0

c  -1-1 --> -2
c    ( b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧  b^{1, 787}_0 ∧ -p_787) -> ( b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0)
c  in CNF:
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨  b^{1, 788}_2
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨  b^{1, 788}_1
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨  p_787 ∨ -b^{1, 788}_0
c  in DIMACS:
-3521  3522 -3523  787  3524 0
-3521  3522 -3523  787  3525 0
-3521  3522 -3523  787 -3526 0

c  -2-1 --> break 
c    ( b^{1, 787}_2 ∧  b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧ -p_787) -> break
c  in CNF:
c    -b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨  b^{1, 787}_0 ∨  p_787 ∨ break
c  in DIMACS:
-3521 -3522  3523  787 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 787}_2 ∧ -b^{1, 787}_1 ∧ -b^{1, 787}_0 ∧ true) 
c  in CNF:
c    -b^{1, 787}_2 ∨  b^{1, 787}_1 ∨  b^{1, 787}_0 ∨ false 
c  in DIMACS:
-3521  3522  3523  0

c  3 does not represent an automaton state.
c    -(-b^{1, 787}_2 ∧  b^{1, 787}_1 ∧  b^{1, 787}_0 ∧ true) 
c  in CNF:
c     b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ false 
c  in DIMACS:
 3521 -3522 -3523  0
c  -3 does not represent an automaton state.
c    -( b^{1, 787}_2 ∧  b^{1, 787}_1 ∧  b^{1, 787}_0 ∧ true) 
c  in CNF:
c    -b^{1, 787}_2 ∨ -b^{1, 787}_1 ∨ -b^{1, 787}_0 ∨ false 
c  in DIMACS:
-3521 -3522 -3523  0

c i = 788
c  -2+1 --> -1
c    ( b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧  p_788) -> ( b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0)
c  in CNF:
c    -b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨  b^{1, 789}_2
c    -b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_1
c    -b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨  b^{1, 789}_0
c  in DIMACS:
-3524 -3525  3526 -788  3527 0
-3524 -3525  3526 -788 -3528 0
-3524 -3525  3526 -788  3529 0

c  -1+1 --> 0
c    ( b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0 ∧  p_788) -> (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧ -b^{1, 789}_0)
c  in CNF:
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_2
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_1
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_0
c  in DIMACS:
-3524  3525 -3526 -788 -3527 0
-3524  3525 -3526 -788 -3528 0
-3524  3525 -3526 -788 -3529 0

c  0+1 --> 1
c    (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧  p_788) -> (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0)
c  in CNF:
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_2
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_1
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨  b^{1, 789}_0
c  in DIMACS:
 3524  3525  3526 -788 -3527 0
 3524  3525  3526 -788 -3528 0
 3524  3525  3526 -788  3529 0

c  1+1 --> 2
c    (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0 ∧  p_788) -> (-b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0)
c  in CNF:
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_2
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨  b^{1, 789}_1
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ -p_788 ∨ -b^{1, 789}_0
c  in DIMACS:
 3524  3525 -3526 -788 -3527 0
 3524  3525 -3526 -788  3528 0
 3524  3525 -3526 -788 -3529 0

c  2+1 --> break 
c    (-b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧  p_788) -> break
c  in CNF:
c     b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ -p_788 ∨ break
c  in DIMACS:
 3524 -3525  3526 -788 1162 0


c  2-1 --> 1
c    (-b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧ -p_788) -> (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0)
c  in CNF:
c     b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_2
c     b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_1
c     b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨  b^{1, 789}_0
c  in DIMACS:
 3524 -3525  3526  788 -3527 0
 3524 -3525  3526  788 -3528 0
 3524 -3525  3526  788  3529 0

c  1-1 --> 0
c    (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0 ∧ -p_788) -> (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧ -b^{1, 789}_0)
c  in CNF:
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_2
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_1
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_0
c  in DIMACS:
 3524  3525 -3526  788 -3527 0
 3524  3525 -3526  788 -3528 0
 3524  3525 -3526  788 -3529 0

c  0-1 --> -1
c    (-b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧ -p_788) -> ( b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0)
c  in CNF:
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨  b^{1, 789}_2
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_1
c     b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨  b^{1, 789}_0
c  in DIMACS:
 3524  3525  3526  788  3527 0
 3524  3525  3526  788 -3528 0
 3524  3525  3526  788  3529 0

c  -1-1 --> -2
c    ( b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧  b^{1, 788}_0 ∧ -p_788) -> ( b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0)
c  in CNF:
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨  b^{1, 789}_2
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨  b^{1, 789}_1
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨  p_788 ∨ -b^{1, 789}_0
c  in DIMACS:
-3524  3525 -3526  788  3527 0
-3524  3525 -3526  788  3528 0
-3524  3525 -3526  788 -3529 0

c  -2-1 --> break 
c    ( b^{1, 788}_2 ∧  b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧ -p_788) -> break
c  in CNF:
c    -b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨  b^{1, 788}_0 ∨  p_788 ∨ break
c  in DIMACS:
-3524 -3525  3526  788 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 788}_2 ∧ -b^{1, 788}_1 ∧ -b^{1, 788}_0 ∧ true) 
c  in CNF:
c    -b^{1, 788}_2 ∨  b^{1, 788}_1 ∨  b^{1, 788}_0 ∨ false 
c  in DIMACS:
-3524  3525  3526  0

c  3 does not represent an automaton state.
c    -(-b^{1, 788}_2 ∧  b^{1, 788}_1 ∧  b^{1, 788}_0 ∧ true) 
c  in CNF:
c     b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ false 
c  in DIMACS:
 3524 -3525 -3526  0
c  -3 does not represent an automaton state.
c    -( b^{1, 788}_2 ∧  b^{1, 788}_1 ∧  b^{1, 788}_0 ∧ true) 
c  in CNF:
c    -b^{1, 788}_2 ∨ -b^{1, 788}_1 ∨ -b^{1, 788}_0 ∨ false 
c  in DIMACS:
-3524 -3525 -3526  0

c i = 789
c  -2+1 --> -1
c    ( b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧  p_789) -> ( b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0)
c  in CNF:
c    -b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨  b^{1, 790}_2
c    -b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_1
c    -b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨  b^{1, 790}_0
c  in DIMACS:
-3527 -3528  3529 -789  3530 0
-3527 -3528  3529 -789 -3531 0
-3527 -3528  3529 -789  3532 0

c  -1+1 --> 0
c    ( b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0 ∧  p_789) -> (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧ -b^{1, 790}_0)
c  in CNF:
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_2
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_1
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_0
c  in DIMACS:
-3527  3528 -3529 -789 -3530 0
-3527  3528 -3529 -789 -3531 0
-3527  3528 -3529 -789 -3532 0

c  0+1 --> 1
c    (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧  p_789) -> (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0)
c  in CNF:
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_2
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_1
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨  b^{1, 790}_0
c  in DIMACS:
 3527  3528  3529 -789 -3530 0
 3527  3528  3529 -789 -3531 0
 3527  3528  3529 -789  3532 0

c  1+1 --> 2
c    (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0 ∧  p_789) -> (-b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0)
c  in CNF:
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_2
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨  b^{1, 790}_1
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ -p_789 ∨ -b^{1, 790}_0
c  in DIMACS:
 3527  3528 -3529 -789 -3530 0
 3527  3528 -3529 -789  3531 0
 3527  3528 -3529 -789 -3532 0

c  2+1 --> break 
c    (-b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧  p_789) -> break
c  in CNF:
c     b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ -p_789 ∨ break
c  in DIMACS:
 3527 -3528  3529 -789 1162 0


c  2-1 --> 1
c    (-b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧ -p_789) -> (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0)
c  in CNF:
c     b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_2
c     b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_1
c     b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨  b^{1, 790}_0
c  in DIMACS:
 3527 -3528  3529  789 -3530 0
 3527 -3528  3529  789 -3531 0
 3527 -3528  3529  789  3532 0

c  1-1 --> 0
c    (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0 ∧ -p_789) -> (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧ -b^{1, 790}_0)
c  in CNF:
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_2
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_1
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_0
c  in DIMACS:
 3527  3528 -3529  789 -3530 0
 3527  3528 -3529  789 -3531 0
 3527  3528 -3529  789 -3532 0

c  0-1 --> -1
c    (-b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧ -p_789) -> ( b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0)
c  in CNF:
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨  b^{1, 790}_2
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_1
c     b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨  b^{1, 790}_0
c  in DIMACS:
 3527  3528  3529  789  3530 0
 3527  3528  3529  789 -3531 0
 3527  3528  3529  789  3532 0

c  -1-1 --> -2
c    ( b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧  b^{1, 789}_0 ∧ -p_789) -> ( b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0)
c  in CNF:
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨  b^{1, 790}_2
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨  b^{1, 790}_1
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨  p_789 ∨ -b^{1, 790}_0
c  in DIMACS:
-3527  3528 -3529  789  3530 0
-3527  3528 -3529  789  3531 0
-3527  3528 -3529  789 -3532 0

c  -2-1 --> break 
c    ( b^{1, 789}_2 ∧  b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧ -p_789) -> break
c  in CNF:
c    -b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨  b^{1, 789}_0 ∨  p_789 ∨ break
c  in DIMACS:
-3527 -3528  3529  789 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 789}_2 ∧ -b^{1, 789}_1 ∧ -b^{1, 789}_0 ∧ true) 
c  in CNF:
c    -b^{1, 789}_2 ∨  b^{1, 789}_1 ∨  b^{1, 789}_0 ∨ false 
c  in DIMACS:
-3527  3528  3529  0

c  3 does not represent an automaton state.
c    -(-b^{1, 789}_2 ∧  b^{1, 789}_1 ∧  b^{1, 789}_0 ∧ true) 
c  in CNF:
c     b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ false 
c  in DIMACS:
 3527 -3528 -3529  0
c  -3 does not represent an automaton state.
c    -( b^{1, 789}_2 ∧  b^{1, 789}_1 ∧  b^{1, 789}_0 ∧ true) 
c  in CNF:
c    -b^{1, 789}_2 ∨ -b^{1, 789}_1 ∨ -b^{1, 789}_0 ∨ false 
c  in DIMACS:
-3527 -3528 -3529  0

c i = 790
c  -2+1 --> -1
c    ( b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧  p_790) -> ( b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0)
c  in CNF:
c    -b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨  b^{1, 791}_2
c    -b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_1
c    -b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨  b^{1, 791}_0
c  in DIMACS:
-3530 -3531  3532 -790  3533 0
-3530 -3531  3532 -790 -3534 0
-3530 -3531  3532 -790  3535 0

c  -1+1 --> 0
c    ( b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0 ∧  p_790) -> (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧ -b^{1, 791}_0)
c  in CNF:
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_2
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_1
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_0
c  in DIMACS:
-3530  3531 -3532 -790 -3533 0
-3530  3531 -3532 -790 -3534 0
-3530  3531 -3532 -790 -3535 0

c  0+1 --> 1
c    (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧  p_790) -> (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0)
c  in CNF:
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_2
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_1
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨  b^{1, 791}_0
c  in DIMACS:
 3530  3531  3532 -790 -3533 0
 3530  3531  3532 -790 -3534 0
 3530  3531  3532 -790  3535 0

c  1+1 --> 2
c    (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0 ∧  p_790) -> (-b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0)
c  in CNF:
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_2
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨  b^{1, 791}_1
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ -p_790 ∨ -b^{1, 791}_0
c  in DIMACS:
 3530  3531 -3532 -790 -3533 0
 3530  3531 -3532 -790  3534 0
 3530  3531 -3532 -790 -3535 0

c  2+1 --> break 
c    (-b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧  p_790) -> break
c  in CNF:
c     b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 3530 -3531  3532 -790 1162 0


c  2-1 --> 1
c    (-b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧ -p_790) -> (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0)
c  in CNF:
c     b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_2
c     b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_1
c     b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨  b^{1, 791}_0
c  in DIMACS:
 3530 -3531  3532  790 -3533 0
 3530 -3531  3532  790 -3534 0
 3530 -3531  3532  790  3535 0

c  1-1 --> 0
c    (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0 ∧ -p_790) -> (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧ -b^{1, 791}_0)
c  in CNF:
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_2
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_1
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_0
c  in DIMACS:
 3530  3531 -3532  790 -3533 0
 3530  3531 -3532  790 -3534 0
 3530  3531 -3532  790 -3535 0

c  0-1 --> -1
c    (-b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧ -p_790) -> ( b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0)
c  in CNF:
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨  b^{1, 791}_2
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_1
c     b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨  b^{1, 791}_0
c  in DIMACS:
 3530  3531  3532  790  3533 0
 3530  3531  3532  790 -3534 0
 3530  3531  3532  790  3535 0

c  -1-1 --> -2
c    ( b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧  b^{1, 790}_0 ∧ -p_790) -> ( b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0)
c  in CNF:
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨  b^{1, 791}_2
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨  b^{1, 791}_1
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨  p_790 ∨ -b^{1, 791}_0
c  in DIMACS:
-3530  3531 -3532  790  3533 0
-3530  3531 -3532  790  3534 0
-3530  3531 -3532  790 -3535 0

c  -2-1 --> break 
c    ( b^{1, 790}_2 ∧  b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨  b^{1, 790}_0 ∨  p_790 ∨ break
c  in DIMACS:
-3530 -3531  3532  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 790}_2 ∧ -b^{1, 790}_1 ∧ -b^{1, 790}_0 ∧ true) 
c  in CNF:
c    -b^{1, 790}_2 ∨  b^{1, 790}_1 ∨  b^{1, 790}_0 ∨ false 
c  in DIMACS:
-3530  3531  3532  0

c  3 does not represent an automaton state.
c    -(-b^{1, 790}_2 ∧  b^{1, 790}_1 ∧  b^{1, 790}_0 ∧ true) 
c  in CNF:
c     b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ false 
c  in DIMACS:
 3530 -3531 -3532  0
c  -3 does not represent an automaton state.
c    -( b^{1, 790}_2 ∧  b^{1, 790}_1 ∧  b^{1, 790}_0 ∧ true) 
c  in CNF:
c    -b^{1, 790}_2 ∨ -b^{1, 790}_1 ∨ -b^{1, 790}_0 ∨ false 
c  in DIMACS:
-3530 -3531 -3532  0

c i = 791
c  -2+1 --> -1
c    ( b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧  p_791) -> ( b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0)
c  in CNF:
c    -b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨  b^{1, 792}_2
c    -b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_1
c    -b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨  b^{1, 792}_0
c  in DIMACS:
-3533 -3534  3535 -791  3536 0
-3533 -3534  3535 -791 -3537 0
-3533 -3534  3535 -791  3538 0

c  -1+1 --> 0
c    ( b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0 ∧  p_791) -> (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧ -b^{1, 792}_0)
c  in CNF:
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_2
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_1
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_0
c  in DIMACS:
-3533  3534 -3535 -791 -3536 0
-3533  3534 -3535 -791 -3537 0
-3533  3534 -3535 -791 -3538 0

c  0+1 --> 1
c    (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧  p_791) -> (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0)
c  in CNF:
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_2
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_1
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨  b^{1, 792}_0
c  in DIMACS:
 3533  3534  3535 -791 -3536 0
 3533  3534  3535 -791 -3537 0
 3533  3534  3535 -791  3538 0

c  1+1 --> 2
c    (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0 ∧  p_791) -> (-b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0)
c  in CNF:
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_2
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨  b^{1, 792}_1
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ -p_791 ∨ -b^{1, 792}_0
c  in DIMACS:
 3533  3534 -3535 -791 -3536 0
 3533  3534 -3535 -791  3537 0
 3533  3534 -3535 -791 -3538 0

c  2+1 --> break 
c    (-b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧  p_791) -> break
c  in CNF:
c     b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ -p_791 ∨ break
c  in DIMACS:
 3533 -3534  3535 -791 1162 0


c  2-1 --> 1
c    (-b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧ -p_791) -> (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0)
c  in CNF:
c     b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_2
c     b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_1
c     b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨  b^{1, 792}_0
c  in DIMACS:
 3533 -3534  3535  791 -3536 0
 3533 -3534  3535  791 -3537 0
 3533 -3534  3535  791  3538 0

c  1-1 --> 0
c    (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0 ∧ -p_791) -> (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧ -b^{1, 792}_0)
c  in CNF:
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_2
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_1
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_0
c  in DIMACS:
 3533  3534 -3535  791 -3536 0
 3533  3534 -3535  791 -3537 0
 3533  3534 -3535  791 -3538 0

c  0-1 --> -1
c    (-b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧ -p_791) -> ( b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0)
c  in CNF:
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨  b^{1, 792}_2
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_1
c     b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨  b^{1, 792}_0
c  in DIMACS:
 3533  3534  3535  791  3536 0
 3533  3534  3535  791 -3537 0
 3533  3534  3535  791  3538 0

c  -1-1 --> -2
c    ( b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧  b^{1, 791}_0 ∧ -p_791) -> ( b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0)
c  in CNF:
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨  b^{1, 792}_2
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨  b^{1, 792}_1
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨  p_791 ∨ -b^{1, 792}_0
c  in DIMACS:
-3533  3534 -3535  791  3536 0
-3533  3534 -3535  791  3537 0
-3533  3534 -3535  791 -3538 0

c  -2-1 --> break 
c    ( b^{1, 791}_2 ∧  b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧ -p_791) -> break
c  in CNF:
c    -b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨  b^{1, 791}_0 ∨  p_791 ∨ break
c  in DIMACS:
-3533 -3534  3535  791 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 791}_2 ∧ -b^{1, 791}_1 ∧ -b^{1, 791}_0 ∧ true) 
c  in CNF:
c    -b^{1, 791}_2 ∨  b^{1, 791}_1 ∨  b^{1, 791}_0 ∨ false 
c  in DIMACS:
-3533  3534  3535  0

c  3 does not represent an automaton state.
c    -(-b^{1, 791}_2 ∧  b^{1, 791}_1 ∧  b^{1, 791}_0 ∧ true) 
c  in CNF:
c     b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ false 
c  in DIMACS:
 3533 -3534 -3535  0
c  -3 does not represent an automaton state.
c    -( b^{1, 791}_2 ∧  b^{1, 791}_1 ∧  b^{1, 791}_0 ∧ true) 
c  in CNF:
c    -b^{1, 791}_2 ∨ -b^{1, 791}_1 ∨ -b^{1, 791}_0 ∨ false 
c  in DIMACS:
-3533 -3534 -3535  0

c i = 792
c  -2+1 --> -1
c    ( b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧  p_792) -> ( b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0)
c  in CNF:
c    -b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨  b^{1, 793}_2
c    -b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_1
c    -b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨  b^{1, 793}_0
c  in DIMACS:
-3536 -3537  3538 -792  3539 0
-3536 -3537  3538 -792 -3540 0
-3536 -3537  3538 -792  3541 0

c  -1+1 --> 0
c    ( b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0 ∧  p_792) -> (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧ -b^{1, 793}_0)
c  in CNF:
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_2
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_1
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_0
c  in DIMACS:
-3536  3537 -3538 -792 -3539 0
-3536  3537 -3538 -792 -3540 0
-3536  3537 -3538 -792 -3541 0

c  0+1 --> 1
c    (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧  p_792) -> (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0)
c  in CNF:
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_2
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_1
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨  b^{1, 793}_0
c  in DIMACS:
 3536  3537  3538 -792 -3539 0
 3536  3537  3538 -792 -3540 0
 3536  3537  3538 -792  3541 0

c  1+1 --> 2
c    (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0 ∧  p_792) -> (-b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0)
c  in CNF:
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_2
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨  b^{1, 793}_1
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ -p_792 ∨ -b^{1, 793}_0
c  in DIMACS:
 3536  3537 -3538 -792 -3539 0
 3536  3537 -3538 -792  3540 0
 3536  3537 -3538 -792 -3541 0

c  2+1 --> break 
c    (-b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧  p_792) -> break
c  in CNF:
c     b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 3536 -3537  3538 -792 1162 0


c  2-1 --> 1
c    (-b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧ -p_792) -> (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0)
c  in CNF:
c     b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_2
c     b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_1
c     b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨  b^{1, 793}_0
c  in DIMACS:
 3536 -3537  3538  792 -3539 0
 3536 -3537  3538  792 -3540 0
 3536 -3537  3538  792  3541 0

c  1-1 --> 0
c    (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0 ∧ -p_792) -> (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧ -b^{1, 793}_0)
c  in CNF:
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_2
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_1
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_0
c  in DIMACS:
 3536  3537 -3538  792 -3539 0
 3536  3537 -3538  792 -3540 0
 3536  3537 -3538  792 -3541 0

c  0-1 --> -1
c    (-b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧ -p_792) -> ( b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0)
c  in CNF:
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨  b^{1, 793}_2
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_1
c     b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨  b^{1, 793}_0
c  in DIMACS:
 3536  3537  3538  792  3539 0
 3536  3537  3538  792 -3540 0
 3536  3537  3538  792  3541 0

c  -1-1 --> -2
c    ( b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧  b^{1, 792}_0 ∧ -p_792) -> ( b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0)
c  in CNF:
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨  b^{1, 793}_2
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨  b^{1, 793}_1
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨  p_792 ∨ -b^{1, 793}_0
c  in DIMACS:
-3536  3537 -3538  792  3539 0
-3536  3537 -3538  792  3540 0
-3536  3537 -3538  792 -3541 0

c  -2-1 --> break 
c    ( b^{1, 792}_2 ∧  b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨  b^{1, 792}_0 ∨  p_792 ∨ break
c  in DIMACS:
-3536 -3537  3538  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 792}_2 ∧ -b^{1, 792}_1 ∧ -b^{1, 792}_0 ∧ true) 
c  in CNF:
c    -b^{1, 792}_2 ∨  b^{1, 792}_1 ∨  b^{1, 792}_0 ∨ false 
c  in DIMACS:
-3536  3537  3538  0

c  3 does not represent an automaton state.
c    -(-b^{1, 792}_2 ∧  b^{1, 792}_1 ∧  b^{1, 792}_0 ∧ true) 
c  in CNF:
c     b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ false 
c  in DIMACS:
 3536 -3537 -3538  0
c  -3 does not represent an automaton state.
c    -( b^{1, 792}_2 ∧  b^{1, 792}_1 ∧  b^{1, 792}_0 ∧ true) 
c  in CNF:
c    -b^{1, 792}_2 ∨ -b^{1, 792}_1 ∨ -b^{1, 792}_0 ∨ false 
c  in DIMACS:
-3536 -3537 -3538  0

c i = 793
c  -2+1 --> -1
c    ( b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧  p_793) -> ( b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0)
c  in CNF:
c    -b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨  b^{1, 794}_2
c    -b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_1
c    -b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨  b^{1, 794}_0
c  in DIMACS:
-3539 -3540  3541 -793  3542 0
-3539 -3540  3541 -793 -3543 0
-3539 -3540  3541 -793  3544 0

c  -1+1 --> 0
c    ( b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0 ∧  p_793) -> (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧ -b^{1, 794}_0)
c  in CNF:
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_2
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_1
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_0
c  in DIMACS:
-3539  3540 -3541 -793 -3542 0
-3539  3540 -3541 -793 -3543 0
-3539  3540 -3541 -793 -3544 0

c  0+1 --> 1
c    (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧  p_793) -> (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0)
c  in CNF:
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_2
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_1
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨  b^{1, 794}_0
c  in DIMACS:
 3539  3540  3541 -793 -3542 0
 3539  3540  3541 -793 -3543 0
 3539  3540  3541 -793  3544 0

c  1+1 --> 2
c    (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0 ∧  p_793) -> (-b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0)
c  in CNF:
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_2
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨  b^{1, 794}_1
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ -p_793 ∨ -b^{1, 794}_0
c  in DIMACS:
 3539  3540 -3541 -793 -3542 0
 3539  3540 -3541 -793  3543 0
 3539  3540 -3541 -793 -3544 0

c  2+1 --> break 
c    (-b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧  p_793) -> break
c  in CNF:
c     b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ -p_793 ∨ break
c  in DIMACS:
 3539 -3540  3541 -793 1162 0


c  2-1 --> 1
c    (-b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧ -p_793) -> (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0)
c  in CNF:
c     b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_2
c     b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_1
c     b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨  b^{1, 794}_0
c  in DIMACS:
 3539 -3540  3541  793 -3542 0
 3539 -3540  3541  793 -3543 0
 3539 -3540  3541  793  3544 0

c  1-1 --> 0
c    (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0 ∧ -p_793) -> (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧ -b^{1, 794}_0)
c  in CNF:
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_2
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_1
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_0
c  in DIMACS:
 3539  3540 -3541  793 -3542 0
 3539  3540 -3541  793 -3543 0
 3539  3540 -3541  793 -3544 0

c  0-1 --> -1
c    (-b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧ -p_793) -> ( b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0)
c  in CNF:
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨  b^{1, 794}_2
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_1
c     b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨  b^{1, 794}_0
c  in DIMACS:
 3539  3540  3541  793  3542 0
 3539  3540  3541  793 -3543 0
 3539  3540  3541  793  3544 0

c  -1-1 --> -2
c    ( b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧  b^{1, 793}_0 ∧ -p_793) -> ( b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0)
c  in CNF:
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨  b^{1, 794}_2
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨  b^{1, 794}_1
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨  p_793 ∨ -b^{1, 794}_0
c  in DIMACS:
-3539  3540 -3541  793  3542 0
-3539  3540 -3541  793  3543 0
-3539  3540 -3541  793 -3544 0

c  -2-1 --> break 
c    ( b^{1, 793}_2 ∧  b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧ -p_793) -> break
c  in CNF:
c    -b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨  b^{1, 793}_0 ∨  p_793 ∨ break
c  in DIMACS:
-3539 -3540  3541  793 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 793}_2 ∧ -b^{1, 793}_1 ∧ -b^{1, 793}_0 ∧ true) 
c  in CNF:
c    -b^{1, 793}_2 ∨  b^{1, 793}_1 ∨  b^{1, 793}_0 ∨ false 
c  in DIMACS:
-3539  3540  3541  0

c  3 does not represent an automaton state.
c    -(-b^{1, 793}_2 ∧  b^{1, 793}_1 ∧  b^{1, 793}_0 ∧ true) 
c  in CNF:
c     b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ false 
c  in DIMACS:
 3539 -3540 -3541  0
c  -3 does not represent an automaton state.
c    -( b^{1, 793}_2 ∧  b^{1, 793}_1 ∧  b^{1, 793}_0 ∧ true) 
c  in CNF:
c    -b^{1, 793}_2 ∨ -b^{1, 793}_1 ∨ -b^{1, 793}_0 ∨ false 
c  in DIMACS:
-3539 -3540 -3541  0

c i = 794
c  -2+1 --> -1
c    ( b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧  p_794) -> ( b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0)
c  in CNF:
c    -b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨  b^{1, 795}_2
c    -b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_1
c    -b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨  b^{1, 795}_0
c  in DIMACS:
-3542 -3543  3544 -794  3545 0
-3542 -3543  3544 -794 -3546 0
-3542 -3543  3544 -794  3547 0

c  -1+1 --> 0
c    ( b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0 ∧  p_794) -> (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧ -b^{1, 795}_0)
c  in CNF:
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_2
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_1
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_0
c  in DIMACS:
-3542  3543 -3544 -794 -3545 0
-3542  3543 -3544 -794 -3546 0
-3542  3543 -3544 -794 -3547 0

c  0+1 --> 1
c    (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧  p_794) -> (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0)
c  in CNF:
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_2
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_1
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨  b^{1, 795}_0
c  in DIMACS:
 3542  3543  3544 -794 -3545 0
 3542  3543  3544 -794 -3546 0
 3542  3543  3544 -794  3547 0

c  1+1 --> 2
c    (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0 ∧  p_794) -> (-b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0)
c  in CNF:
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_2
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨  b^{1, 795}_1
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ -p_794 ∨ -b^{1, 795}_0
c  in DIMACS:
 3542  3543 -3544 -794 -3545 0
 3542  3543 -3544 -794  3546 0
 3542  3543 -3544 -794 -3547 0

c  2+1 --> break 
c    (-b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧  p_794) -> break
c  in CNF:
c     b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ -p_794 ∨ break
c  in DIMACS:
 3542 -3543  3544 -794 1162 0


c  2-1 --> 1
c    (-b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧ -p_794) -> (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0)
c  in CNF:
c     b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_2
c     b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_1
c     b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨  b^{1, 795}_0
c  in DIMACS:
 3542 -3543  3544  794 -3545 0
 3542 -3543  3544  794 -3546 0
 3542 -3543  3544  794  3547 0

c  1-1 --> 0
c    (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0 ∧ -p_794) -> (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧ -b^{1, 795}_0)
c  in CNF:
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_2
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_1
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_0
c  in DIMACS:
 3542  3543 -3544  794 -3545 0
 3542  3543 -3544  794 -3546 0
 3542  3543 -3544  794 -3547 0

c  0-1 --> -1
c    (-b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧ -p_794) -> ( b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0)
c  in CNF:
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨  b^{1, 795}_2
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_1
c     b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨  b^{1, 795}_0
c  in DIMACS:
 3542  3543  3544  794  3545 0
 3542  3543  3544  794 -3546 0
 3542  3543  3544  794  3547 0

c  -1-1 --> -2
c    ( b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧  b^{1, 794}_0 ∧ -p_794) -> ( b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0)
c  in CNF:
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨  b^{1, 795}_2
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨  b^{1, 795}_1
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨  p_794 ∨ -b^{1, 795}_0
c  in DIMACS:
-3542  3543 -3544  794  3545 0
-3542  3543 -3544  794  3546 0
-3542  3543 -3544  794 -3547 0

c  -2-1 --> break 
c    ( b^{1, 794}_2 ∧  b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧ -p_794) -> break
c  in CNF:
c    -b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨  b^{1, 794}_0 ∨  p_794 ∨ break
c  in DIMACS:
-3542 -3543  3544  794 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 794}_2 ∧ -b^{1, 794}_1 ∧ -b^{1, 794}_0 ∧ true) 
c  in CNF:
c    -b^{1, 794}_2 ∨  b^{1, 794}_1 ∨  b^{1, 794}_0 ∨ false 
c  in DIMACS:
-3542  3543  3544  0

c  3 does not represent an automaton state.
c    -(-b^{1, 794}_2 ∧  b^{1, 794}_1 ∧  b^{1, 794}_0 ∧ true) 
c  in CNF:
c     b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ false 
c  in DIMACS:
 3542 -3543 -3544  0
c  -3 does not represent an automaton state.
c    -( b^{1, 794}_2 ∧  b^{1, 794}_1 ∧  b^{1, 794}_0 ∧ true) 
c  in CNF:
c    -b^{1, 794}_2 ∨ -b^{1, 794}_1 ∨ -b^{1, 794}_0 ∨ false 
c  in DIMACS:
-3542 -3543 -3544  0

c i = 795
c  -2+1 --> -1
c    ( b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧  p_795) -> ( b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0)
c  in CNF:
c    -b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨  b^{1, 796}_2
c    -b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_1
c    -b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨  b^{1, 796}_0
c  in DIMACS:
-3545 -3546  3547 -795  3548 0
-3545 -3546  3547 -795 -3549 0
-3545 -3546  3547 -795  3550 0

c  -1+1 --> 0
c    ( b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0 ∧  p_795) -> (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧ -b^{1, 796}_0)
c  in CNF:
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_2
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_1
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_0
c  in DIMACS:
-3545  3546 -3547 -795 -3548 0
-3545  3546 -3547 -795 -3549 0
-3545  3546 -3547 -795 -3550 0

c  0+1 --> 1
c    (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧  p_795) -> (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0)
c  in CNF:
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_2
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_1
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨  b^{1, 796}_0
c  in DIMACS:
 3545  3546  3547 -795 -3548 0
 3545  3546  3547 -795 -3549 0
 3545  3546  3547 -795  3550 0

c  1+1 --> 2
c    (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0 ∧  p_795) -> (-b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0)
c  in CNF:
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_2
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨  b^{1, 796}_1
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ -p_795 ∨ -b^{1, 796}_0
c  in DIMACS:
 3545  3546 -3547 -795 -3548 0
 3545  3546 -3547 -795  3549 0
 3545  3546 -3547 -795 -3550 0

c  2+1 --> break 
c    (-b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧  p_795) -> break
c  in CNF:
c     b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 3545 -3546  3547 -795 1162 0


c  2-1 --> 1
c    (-b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧ -p_795) -> (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0)
c  in CNF:
c     b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_2
c     b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_1
c     b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨  b^{1, 796}_0
c  in DIMACS:
 3545 -3546  3547  795 -3548 0
 3545 -3546  3547  795 -3549 0
 3545 -3546  3547  795  3550 0

c  1-1 --> 0
c    (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0 ∧ -p_795) -> (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧ -b^{1, 796}_0)
c  in CNF:
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_2
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_1
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_0
c  in DIMACS:
 3545  3546 -3547  795 -3548 0
 3545  3546 -3547  795 -3549 0
 3545  3546 -3547  795 -3550 0

c  0-1 --> -1
c    (-b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧ -p_795) -> ( b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0)
c  in CNF:
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨  b^{1, 796}_2
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_1
c     b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨  b^{1, 796}_0
c  in DIMACS:
 3545  3546  3547  795  3548 0
 3545  3546  3547  795 -3549 0
 3545  3546  3547  795  3550 0

c  -1-1 --> -2
c    ( b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧  b^{1, 795}_0 ∧ -p_795) -> ( b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0)
c  in CNF:
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨  b^{1, 796}_2
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨  b^{1, 796}_1
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨  p_795 ∨ -b^{1, 796}_0
c  in DIMACS:
-3545  3546 -3547  795  3548 0
-3545  3546 -3547  795  3549 0
-3545  3546 -3547  795 -3550 0

c  -2-1 --> break 
c    ( b^{1, 795}_2 ∧  b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨  b^{1, 795}_0 ∨  p_795 ∨ break
c  in DIMACS:
-3545 -3546  3547  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 795}_2 ∧ -b^{1, 795}_1 ∧ -b^{1, 795}_0 ∧ true) 
c  in CNF:
c    -b^{1, 795}_2 ∨  b^{1, 795}_1 ∨  b^{1, 795}_0 ∨ false 
c  in DIMACS:
-3545  3546  3547  0

c  3 does not represent an automaton state.
c    -(-b^{1, 795}_2 ∧  b^{1, 795}_1 ∧  b^{1, 795}_0 ∧ true) 
c  in CNF:
c     b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ false 
c  in DIMACS:
 3545 -3546 -3547  0
c  -3 does not represent an automaton state.
c    -( b^{1, 795}_2 ∧  b^{1, 795}_1 ∧  b^{1, 795}_0 ∧ true) 
c  in CNF:
c    -b^{1, 795}_2 ∨ -b^{1, 795}_1 ∨ -b^{1, 795}_0 ∨ false 
c  in DIMACS:
-3545 -3546 -3547  0

c i = 796
c  -2+1 --> -1
c    ( b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧  p_796) -> ( b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0)
c  in CNF:
c    -b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨  b^{1, 797}_2
c    -b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_1
c    -b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨  b^{1, 797}_0
c  in DIMACS:
-3548 -3549  3550 -796  3551 0
-3548 -3549  3550 -796 -3552 0
-3548 -3549  3550 -796  3553 0

c  -1+1 --> 0
c    ( b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0 ∧  p_796) -> (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧ -b^{1, 797}_0)
c  in CNF:
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_2
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_1
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_0
c  in DIMACS:
-3548  3549 -3550 -796 -3551 0
-3548  3549 -3550 -796 -3552 0
-3548  3549 -3550 -796 -3553 0

c  0+1 --> 1
c    (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧  p_796) -> (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0)
c  in CNF:
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_2
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_1
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨  b^{1, 797}_0
c  in DIMACS:
 3548  3549  3550 -796 -3551 0
 3548  3549  3550 -796 -3552 0
 3548  3549  3550 -796  3553 0

c  1+1 --> 2
c    (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0 ∧  p_796) -> (-b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0)
c  in CNF:
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_2
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨  b^{1, 797}_1
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ -p_796 ∨ -b^{1, 797}_0
c  in DIMACS:
 3548  3549 -3550 -796 -3551 0
 3548  3549 -3550 -796  3552 0
 3548  3549 -3550 -796 -3553 0

c  2+1 --> break 
c    (-b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧  p_796) -> break
c  in CNF:
c     b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ -p_796 ∨ break
c  in DIMACS:
 3548 -3549  3550 -796 1162 0


c  2-1 --> 1
c    (-b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧ -p_796) -> (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0)
c  in CNF:
c     b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_2
c     b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_1
c     b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨  b^{1, 797}_0
c  in DIMACS:
 3548 -3549  3550  796 -3551 0
 3548 -3549  3550  796 -3552 0
 3548 -3549  3550  796  3553 0

c  1-1 --> 0
c    (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0 ∧ -p_796) -> (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧ -b^{1, 797}_0)
c  in CNF:
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_2
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_1
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_0
c  in DIMACS:
 3548  3549 -3550  796 -3551 0
 3548  3549 -3550  796 -3552 0
 3548  3549 -3550  796 -3553 0

c  0-1 --> -1
c    (-b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧ -p_796) -> ( b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0)
c  in CNF:
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨  b^{1, 797}_2
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_1
c     b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨  b^{1, 797}_0
c  in DIMACS:
 3548  3549  3550  796  3551 0
 3548  3549  3550  796 -3552 0
 3548  3549  3550  796  3553 0

c  -1-1 --> -2
c    ( b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧  b^{1, 796}_0 ∧ -p_796) -> ( b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0)
c  in CNF:
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨  b^{1, 797}_2
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨  b^{1, 797}_1
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨  p_796 ∨ -b^{1, 797}_0
c  in DIMACS:
-3548  3549 -3550  796  3551 0
-3548  3549 -3550  796  3552 0
-3548  3549 -3550  796 -3553 0

c  -2-1 --> break 
c    ( b^{1, 796}_2 ∧  b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧ -p_796) -> break
c  in CNF:
c    -b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨  b^{1, 796}_0 ∨  p_796 ∨ break
c  in DIMACS:
-3548 -3549  3550  796 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 796}_2 ∧ -b^{1, 796}_1 ∧ -b^{1, 796}_0 ∧ true) 
c  in CNF:
c    -b^{1, 796}_2 ∨  b^{1, 796}_1 ∨  b^{1, 796}_0 ∨ false 
c  in DIMACS:
-3548  3549  3550  0

c  3 does not represent an automaton state.
c    -(-b^{1, 796}_2 ∧  b^{1, 796}_1 ∧  b^{1, 796}_0 ∧ true) 
c  in CNF:
c     b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ false 
c  in DIMACS:
 3548 -3549 -3550  0
c  -3 does not represent an automaton state.
c    -( b^{1, 796}_2 ∧  b^{1, 796}_1 ∧  b^{1, 796}_0 ∧ true) 
c  in CNF:
c    -b^{1, 796}_2 ∨ -b^{1, 796}_1 ∨ -b^{1, 796}_0 ∨ false 
c  in DIMACS:
-3548 -3549 -3550  0

c i = 797
c  -2+1 --> -1
c    ( b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧  p_797) -> ( b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0)
c  in CNF:
c    -b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨  b^{1, 798}_2
c    -b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_1
c    -b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨  b^{1, 798}_0
c  in DIMACS:
-3551 -3552  3553 -797  3554 0
-3551 -3552  3553 -797 -3555 0
-3551 -3552  3553 -797  3556 0

c  -1+1 --> 0
c    ( b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0 ∧  p_797) -> (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧ -b^{1, 798}_0)
c  in CNF:
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_2
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_1
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_0
c  in DIMACS:
-3551  3552 -3553 -797 -3554 0
-3551  3552 -3553 -797 -3555 0
-3551  3552 -3553 -797 -3556 0

c  0+1 --> 1
c    (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧  p_797) -> (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0)
c  in CNF:
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_2
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_1
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨  b^{1, 798}_0
c  in DIMACS:
 3551  3552  3553 -797 -3554 0
 3551  3552  3553 -797 -3555 0
 3551  3552  3553 -797  3556 0

c  1+1 --> 2
c    (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0 ∧  p_797) -> (-b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0)
c  in CNF:
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_2
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨  b^{1, 798}_1
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ -p_797 ∨ -b^{1, 798}_0
c  in DIMACS:
 3551  3552 -3553 -797 -3554 0
 3551  3552 -3553 -797  3555 0
 3551  3552 -3553 -797 -3556 0

c  2+1 --> break 
c    (-b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧  p_797) -> break
c  in CNF:
c     b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ -p_797 ∨ break
c  in DIMACS:
 3551 -3552  3553 -797 1162 0


c  2-1 --> 1
c    (-b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧ -p_797) -> (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0)
c  in CNF:
c     b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_2
c     b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_1
c     b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨  b^{1, 798}_0
c  in DIMACS:
 3551 -3552  3553  797 -3554 0
 3551 -3552  3553  797 -3555 0
 3551 -3552  3553  797  3556 0

c  1-1 --> 0
c    (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0 ∧ -p_797) -> (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧ -b^{1, 798}_0)
c  in CNF:
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_2
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_1
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_0
c  in DIMACS:
 3551  3552 -3553  797 -3554 0
 3551  3552 -3553  797 -3555 0
 3551  3552 -3553  797 -3556 0

c  0-1 --> -1
c    (-b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧ -p_797) -> ( b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0)
c  in CNF:
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨  b^{1, 798}_2
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_1
c     b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨  b^{1, 798}_0
c  in DIMACS:
 3551  3552  3553  797  3554 0
 3551  3552  3553  797 -3555 0
 3551  3552  3553  797  3556 0

c  -1-1 --> -2
c    ( b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧  b^{1, 797}_0 ∧ -p_797) -> ( b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0)
c  in CNF:
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨  b^{1, 798}_2
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨  b^{1, 798}_1
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨  p_797 ∨ -b^{1, 798}_0
c  in DIMACS:
-3551  3552 -3553  797  3554 0
-3551  3552 -3553  797  3555 0
-3551  3552 -3553  797 -3556 0

c  -2-1 --> break 
c    ( b^{1, 797}_2 ∧  b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧ -p_797) -> break
c  in CNF:
c    -b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨  b^{1, 797}_0 ∨  p_797 ∨ break
c  in DIMACS:
-3551 -3552  3553  797 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 797}_2 ∧ -b^{1, 797}_1 ∧ -b^{1, 797}_0 ∧ true) 
c  in CNF:
c    -b^{1, 797}_2 ∨  b^{1, 797}_1 ∨  b^{1, 797}_0 ∨ false 
c  in DIMACS:
-3551  3552  3553  0

c  3 does not represent an automaton state.
c    -(-b^{1, 797}_2 ∧  b^{1, 797}_1 ∧  b^{1, 797}_0 ∧ true) 
c  in CNF:
c     b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ false 
c  in DIMACS:
 3551 -3552 -3553  0
c  -3 does not represent an automaton state.
c    -( b^{1, 797}_2 ∧  b^{1, 797}_1 ∧  b^{1, 797}_0 ∧ true) 
c  in CNF:
c    -b^{1, 797}_2 ∨ -b^{1, 797}_1 ∨ -b^{1, 797}_0 ∨ false 
c  in DIMACS:
-3551 -3552 -3553  0

c i = 798
c  -2+1 --> -1
c    ( b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧  p_798) -> ( b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0)
c  in CNF:
c    -b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨  b^{1, 799}_2
c    -b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_1
c    -b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨  b^{1, 799}_0
c  in DIMACS:
-3554 -3555  3556 -798  3557 0
-3554 -3555  3556 -798 -3558 0
-3554 -3555  3556 -798  3559 0

c  -1+1 --> 0
c    ( b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0 ∧  p_798) -> (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧ -b^{1, 799}_0)
c  in CNF:
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_2
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_1
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_0
c  in DIMACS:
-3554  3555 -3556 -798 -3557 0
-3554  3555 -3556 -798 -3558 0
-3554  3555 -3556 -798 -3559 0

c  0+1 --> 1
c    (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧  p_798) -> (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0)
c  in CNF:
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_2
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_1
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨  b^{1, 799}_0
c  in DIMACS:
 3554  3555  3556 -798 -3557 0
 3554  3555  3556 -798 -3558 0
 3554  3555  3556 -798  3559 0

c  1+1 --> 2
c    (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0 ∧  p_798) -> (-b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0)
c  in CNF:
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_2
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨  b^{1, 799}_1
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ -p_798 ∨ -b^{1, 799}_0
c  in DIMACS:
 3554  3555 -3556 -798 -3557 0
 3554  3555 -3556 -798  3558 0
 3554  3555 -3556 -798 -3559 0

c  2+1 --> break 
c    (-b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧  p_798) -> break
c  in CNF:
c     b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 3554 -3555  3556 -798 1162 0


c  2-1 --> 1
c    (-b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧ -p_798) -> (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0)
c  in CNF:
c     b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_2
c     b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_1
c     b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨  b^{1, 799}_0
c  in DIMACS:
 3554 -3555  3556  798 -3557 0
 3554 -3555  3556  798 -3558 0
 3554 -3555  3556  798  3559 0

c  1-1 --> 0
c    (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0 ∧ -p_798) -> (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧ -b^{1, 799}_0)
c  in CNF:
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_2
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_1
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_0
c  in DIMACS:
 3554  3555 -3556  798 -3557 0
 3554  3555 -3556  798 -3558 0
 3554  3555 -3556  798 -3559 0

c  0-1 --> -1
c    (-b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧ -p_798) -> ( b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0)
c  in CNF:
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨  b^{1, 799}_2
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_1
c     b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨  b^{1, 799}_0
c  in DIMACS:
 3554  3555  3556  798  3557 0
 3554  3555  3556  798 -3558 0
 3554  3555  3556  798  3559 0

c  -1-1 --> -2
c    ( b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧  b^{1, 798}_0 ∧ -p_798) -> ( b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0)
c  in CNF:
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨  b^{1, 799}_2
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨  b^{1, 799}_1
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨  p_798 ∨ -b^{1, 799}_0
c  in DIMACS:
-3554  3555 -3556  798  3557 0
-3554  3555 -3556  798  3558 0
-3554  3555 -3556  798 -3559 0

c  -2-1 --> break 
c    ( b^{1, 798}_2 ∧  b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨  b^{1, 798}_0 ∨  p_798 ∨ break
c  in DIMACS:
-3554 -3555  3556  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 798}_2 ∧ -b^{1, 798}_1 ∧ -b^{1, 798}_0 ∧ true) 
c  in CNF:
c    -b^{1, 798}_2 ∨  b^{1, 798}_1 ∨  b^{1, 798}_0 ∨ false 
c  in DIMACS:
-3554  3555  3556  0

c  3 does not represent an automaton state.
c    -(-b^{1, 798}_2 ∧  b^{1, 798}_1 ∧  b^{1, 798}_0 ∧ true) 
c  in CNF:
c     b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ false 
c  in DIMACS:
 3554 -3555 -3556  0
c  -3 does not represent an automaton state.
c    -( b^{1, 798}_2 ∧  b^{1, 798}_1 ∧  b^{1, 798}_0 ∧ true) 
c  in CNF:
c    -b^{1, 798}_2 ∨ -b^{1, 798}_1 ∨ -b^{1, 798}_0 ∨ false 
c  in DIMACS:
-3554 -3555 -3556  0

c i = 799
c  -2+1 --> -1
c    ( b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧  p_799) -> ( b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0)
c  in CNF:
c    -b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨  b^{1, 800}_2
c    -b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_1
c    -b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨  b^{1, 800}_0
c  in DIMACS:
-3557 -3558  3559 -799  3560 0
-3557 -3558  3559 -799 -3561 0
-3557 -3558  3559 -799  3562 0

c  -1+1 --> 0
c    ( b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0 ∧  p_799) -> (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧ -b^{1, 800}_0)
c  in CNF:
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_2
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_1
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_0
c  in DIMACS:
-3557  3558 -3559 -799 -3560 0
-3557  3558 -3559 -799 -3561 0
-3557  3558 -3559 -799 -3562 0

c  0+1 --> 1
c    (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧  p_799) -> (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0)
c  in CNF:
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_2
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_1
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨  b^{1, 800}_0
c  in DIMACS:
 3557  3558  3559 -799 -3560 0
 3557  3558  3559 -799 -3561 0
 3557  3558  3559 -799  3562 0

c  1+1 --> 2
c    (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0 ∧  p_799) -> (-b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0)
c  in CNF:
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_2
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨  b^{1, 800}_1
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ -p_799 ∨ -b^{1, 800}_0
c  in DIMACS:
 3557  3558 -3559 -799 -3560 0
 3557  3558 -3559 -799  3561 0
 3557  3558 -3559 -799 -3562 0

c  2+1 --> break 
c    (-b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧  p_799) -> break
c  in CNF:
c     b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ -p_799 ∨ break
c  in DIMACS:
 3557 -3558  3559 -799 1162 0


c  2-1 --> 1
c    (-b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧ -p_799) -> (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0)
c  in CNF:
c     b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_2
c     b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_1
c     b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨  b^{1, 800}_0
c  in DIMACS:
 3557 -3558  3559  799 -3560 0
 3557 -3558  3559  799 -3561 0
 3557 -3558  3559  799  3562 0

c  1-1 --> 0
c    (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0 ∧ -p_799) -> (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧ -b^{1, 800}_0)
c  in CNF:
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_2
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_1
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_0
c  in DIMACS:
 3557  3558 -3559  799 -3560 0
 3557  3558 -3559  799 -3561 0
 3557  3558 -3559  799 -3562 0

c  0-1 --> -1
c    (-b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧ -p_799) -> ( b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0)
c  in CNF:
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨  b^{1, 800}_2
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_1
c     b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨  b^{1, 800}_0
c  in DIMACS:
 3557  3558  3559  799  3560 0
 3557  3558  3559  799 -3561 0
 3557  3558  3559  799  3562 0

c  -1-1 --> -2
c    ( b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧  b^{1, 799}_0 ∧ -p_799) -> ( b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0)
c  in CNF:
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨  b^{1, 800}_2
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨  b^{1, 800}_1
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨  p_799 ∨ -b^{1, 800}_0
c  in DIMACS:
-3557  3558 -3559  799  3560 0
-3557  3558 -3559  799  3561 0
-3557  3558 -3559  799 -3562 0

c  -2-1 --> break 
c    ( b^{1, 799}_2 ∧  b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧ -p_799) -> break
c  in CNF:
c    -b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨  b^{1, 799}_0 ∨  p_799 ∨ break
c  in DIMACS:
-3557 -3558  3559  799 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 799}_2 ∧ -b^{1, 799}_1 ∧ -b^{1, 799}_0 ∧ true) 
c  in CNF:
c    -b^{1, 799}_2 ∨  b^{1, 799}_1 ∨  b^{1, 799}_0 ∨ false 
c  in DIMACS:
-3557  3558  3559  0

c  3 does not represent an automaton state.
c    -(-b^{1, 799}_2 ∧  b^{1, 799}_1 ∧  b^{1, 799}_0 ∧ true) 
c  in CNF:
c     b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ false 
c  in DIMACS:
 3557 -3558 -3559  0
c  -3 does not represent an automaton state.
c    -( b^{1, 799}_2 ∧  b^{1, 799}_1 ∧  b^{1, 799}_0 ∧ true) 
c  in CNF:
c    -b^{1, 799}_2 ∨ -b^{1, 799}_1 ∨ -b^{1, 799}_0 ∨ false 
c  in DIMACS:
-3557 -3558 -3559  0

c i = 800
c  -2+1 --> -1
c    ( b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧  p_800) -> ( b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0)
c  in CNF:
c    -b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨  b^{1, 801}_2
c    -b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_1
c    -b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨  b^{1, 801}_0
c  in DIMACS:
-3560 -3561  3562 -800  3563 0
-3560 -3561  3562 -800 -3564 0
-3560 -3561  3562 -800  3565 0

c  -1+1 --> 0
c    ( b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0 ∧  p_800) -> (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧ -b^{1, 801}_0)
c  in CNF:
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_2
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_1
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_0
c  in DIMACS:
-3560  3561 -3562 -800 -3563 0
-3560  3561 -3562 -800 -3564 0
-3560  3561 -3562 -800 -3565 0

c  0+1 --> 1
c    (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧  p_800) -> (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0)
c  in CNF:
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_2
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_1
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨  b^{1, 801}_0
c  in DIMACS:
 3560  3561  3562 -800 -3563 0
 3560  3561  3562 -800 -3564 0
 3560  3561  3562 -800  3565 0

c  1+1 --> 2
c    (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0 ∧  p_800) -> (-b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0)
c  in CNF:
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_2
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨  b^{1, 801}_1
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ -p_800 ∨ -b^{1, 801}_0
c  in DIMACS:
 3560  3561 -3562 -800 -3563 0
 3560  3561 -3562 -800  3564 0
 3560  3561 -3562 -800 -3565 0

c  2+1 --> break 
c    (-b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧  p_800) -> break
c  in CNF:
c     b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 3560 -3561  3562 -800 1162 0


c  2-1 --> 1
c    (-b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧ -p_800) -> (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0)
c  in CNF:
c     b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_2
c     b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_1
c     b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨  b^{1, 801}_0
c  in DIMACS:
 3560 -3561  3562  800 -3563 0
 3560 -3561  3562  800 -3564 0
 3560 -3561  3562  800  3565 0

c  1-1 --> 0
c    (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0 ∧ -p_800) -> (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧ -b^{1, 801}_0)
c  in CNF:
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_2
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_1
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_0
c  in DIMACS:
 3560  3561 -3562  800 -3563 0
 3560  3561 -3562  800 -3564 0
 3560  3561 -3562  800 -3565 0

c  0-1 --> -1
c    (-b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧ -p_800) -> ( b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0)
c  in CNF:
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨  b^{1, 801}_2
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_1
c     b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨  b^{1, 801}_0
c  in DIMACS:
 3560  3561  3562  800  3563 0
 3560  3561  3562  800 -3564 0
 3560  3561  3562  800  3565 0

c  -1-1 --> -2
c    ( b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧  b^{1, 800}_0 ∧ -p_800) -> ( b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0)
c  in CNF:
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨  b^{1, 801}_2
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨  b^{1, 801}_1
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨  p_800 ∨ -b^{1, 801}_0
c  in DIMACS:
-3560  3561 -3562  800  3563 0
-3560  3561 -3562  800  3564 0
-3560  3561 -3562  800 -3565 0

c  -2-1 --> break 
c    ( b^{1, 800}_2 ∧  b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨  b^{1, 800}_0 ∨  p_800 ∨ break
c  in DIMACS:
-3560 -3561  3562  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 800}_2 ∧ -b^{1, 800}_1 ∧ -b^{1, 800}_0 ∧ true) 
c  in CNF:
c    -b^{1, 800}_2 ∨  b^{1, 800}_1 ∨  b^{1, 800}_0 ∨ false 
c  in DIMACS:
-3560  3561  3562  0

c  3 does not represent an automaton state.
c    -(-b^{1, 800}_2 ∧  b^{1, 800}_1 ∧  b^{1, 800}_0 ∧ true) 
c  in CNF:
c     b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ false 
c  in DIMACS:
 3560 -3561 -3562  0
c  -3 does not represent an automaton state.
c    -( b^{1, 800}_2 ∧  b^{1, 800}_1 ∧  b^{1, 800}_0 ∧ true) 
c  in CNF:
c    -b^{1, 800}_2 ∨ -b^{1, 800}_1 ∨ -b^{1, 800}_0 ∨ false 
c  in DIMACS:
-3560 -3561 -3562  0

c i = 801
c  -2+1 --> -1
c    ( b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧  p_801) -> ( b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0)
c  in CNF:
c    -b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨  b^{1, 802}_2
c    -b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_1
c    -b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨  b^{1, 802}_0
c  in DIMACS:
-3563 -3564  3565 -801  3566 0
-3563 -3564  3565 -801 -3567 0
-3563 -3564  3565 -801  3568 0

c  -1+1 --> 0
c    ( b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0 ∧  p_801) -> (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧ -b^{1, 802}_0)
c  in CNF:
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_2
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_1
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_0
c  in DIMACS:
-3563  3564 -3565 -801 -3566 0
-3563  3564 -3565 -801 -3567 0
-3563  3564 -3565 -801 -3568 0

c  0+1 --> 1
c    (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧  p_801) -> (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0)
c  in CNF:
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_2
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_1
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨  b^{1, 802}_0
c  in DIMACS:
 3563  3564  3565 -801 -3566 0
 3563  3564  3565 -801 -3567 0
 3563  3564  3565 -801  3568 0

c  1+1 --> 2
c    (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0 ∧  p_801) -> (-b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0)
c  in CNF:
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_2
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨  b^{1, 802}_1
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ -p_801 ∨ -b^{1, 802}_0
c  in DIMACS:
 3563  3564 -3565 -801 -3566 0
 3563  3564 -3565 -801  3567 0
 3563  3564 -3565 -801 -3568 0

c  2+1 --> break 
c    (-b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧  p_801) -> break
c  in CNF:
c     b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ -p_801 ∨ break
c  in DIMACS:
 3563 -3564  3565 -801 1162 0


c  2-1 --> 1
c    (-b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧ -p_801) -> (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0)
c  in CNF:
c     b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_2
c     b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_1
c     b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨  b^{1, 802}_0
c  in DIMACS:
 3563 -3564  3565  801 -3566 0
 3563 -3564  3565  801 -3567 0
 3563 -3564  3565  801  3568 0

c  1-1 --> 0
c    (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0 ∧ -p_801) -> (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧ -b^{1, 802}_0)
c  in CNF:
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_2
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_1
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_0
c  in DIMACS:
 3563  3564 -3565  801 -3566 0
 3563  3564 -3565  801 -3567 0
 3563  3564 -3565  801 -3568 0

c  0-1 --> -1
c    (-b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧ -p_801) -> ( b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0)
c  in CNF:
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨  b^{1, 802}_2
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_1
c     b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨  b^{1, 802}_0
c  in DIMACS:
 3563  3564  3565  801  3566 0
 3563  3564  3565  801 -3567 0
 3563  3564  3565  801  3568 0

c  -1-1 --> -2
c    ( b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧  b^{1, 801}_0 ∧ -p_801) -> ( b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0)
c  in CNF:
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨  b^{1, 802}_2
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨  b^{1, 802}_1
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨  p_801 ∨ -b^{1, 802}_0
c  in DIMACS:
-3563  3564 -3565  801  3566 0
-3563  3564 -3565  801  3567 0
-3563  3564 -3565  801 -3568 0

c  -2-1 --> break 
c    ( b^{1, 801}_2 ∧  b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧ -p_801) -> break
c  in CNF:
c    -b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨  b^{1, 801}_0 ∨  p_801 ∨ break
c  in DIMACS:
-3563 -3564  3565  801 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 801}_2 ∧ -b^{1, 801}_1 ∧ -b^{1, 801}_0 ∧ true) 
c  in CNF:
c    -b^{1, 801}_2 ∨  b^{1, 801}_1 ∨  b^{1, 801}_0 ∨ false 
c  in DIMACS:
-3563  3564  3565  0

c  3 does not represent an automaton state.
c    -(-b^{1, 801}_2 ∧  b^{1, 801}_1 ∧  b^{1, 801}_0 ∧ true) 
c  in CNF:
c     b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ false 
c  in DIMACS:
 3563 -3564 -3565  0
c  -3 does not represent an automaton state.
c    -( b^{1, 801}_2 ∧  b^{1, 801}_1 ∧  b^{1, 801}_0 ∧ true) 
c  in CNF:
c    -b^{1, 801}_2 ∨ -b^{1, 801}_1 ∨ -b^{1, 801}_0 ∨ false 
c  in DIMACS:
-3563 -3564 -3565  0

c i = 802
c  -2+1 --> -1
c    ( b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧  p_802) -> ( b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0)
c  in CNF:
c    -b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨  b^{1, 803}_2
c    -b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_1
c    -b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨  b^{1, 803}_0
c  in DIMACS:
-3566 -3567  3568 -802  3569 0
-3566 -3567  3568 -802 -3570 0
-3566 -3567  3568 -802  3571 0

c  -1+1 --> 0
c    ( b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0 ∧  p_802) -> (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧ -b^{1, 803}_0)
c  in CNF:
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_2
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_1
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_0
c  in DIMACS:
-3566  3567 -3568 -802 -3569 0
-3566  3567 -3568 -802 -3570 0
-3566  3567 -3568 -802 -3571 0

c  0+1 --> 1
c    (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧  p_802) -> (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0)
c  in CNF:
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_2
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_1
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨  b^{1, 803}_0
c  in DIMACS:
 3566  3567  3568 -802 -3569 0
 3566  3567  3568 -802 -3570 0
 3566  3567  3568 -802  3571 0

c  1+1 --> 2
c    (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0 ∧  p_802) -> (-b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0)
c  in CNF:
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_2
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨  b^{1, 803}_1
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ -p_802 ∨ -b^{1, 803}_0
c  in DIMACS:
 3566  3567 -3568 -802 -3569 0
 3566  3567 -3568 -802  3570 0
 3566  3567 -3568 -802 -3571 0

c  2+1 --> break 
c    (-b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧  p_802) -> break
c  in CNF:
c     b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ -p_802 ∨ break
c  in DIMACS:
 3566 -3567  3568 -802 1162 0


c  2-1 --> 1
c    (-b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧ -p_802) -> (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0)
c  in CNF:
c     b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_2
c     b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_1
c     b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨  b^{1, 803}_0
c  in DIMACS:
 3566 -3567  3568  802 -3569 0
 3566 -3567  3568  802 -3570 0
 3566 -3567  3568  802  3571 0

c  1-1 --> 0
c    (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0 ∧ -p_802) -> (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧ -b^{1, 803}_0)
c  in CNF:
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_2
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_1
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_0
c  in DIMACS:
 3566  3567 -3568  802 -3569 0
 3566  3567 -3568  802 -3570 0
 3566  3567 -3568  802 -3571 0

c  0-1 --> -1
c    (-b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧ -p_802) -> ( b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0)
c  in CNF:
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨  b^{1, 803}_2
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_1
c     b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨  b^{1, 803}_0
c  in DIMACS:
 3566  3567  3568  802  3569 0
 3566  3567  3568  802 -3570 0
 3566  3567  3568  802  3571 0

c  -1-1 --> -2
c    ( b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧  b^{1, 802}_0 ∧ -p_802) -> ( b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0)
c  in CNF:
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨  b^{1, 803}_2
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨  b^{1, 803}_1
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨  p_802 ∨ -b^{1, 803}_0
c  in DIMACS:
-3566  3567 -3568  802  3569 0
-3566  3567 -3568  802  3570 0
-3566  3567 -3568  802 -3571 0

c  -2-1 --> break 
c    ( b^{1, 802}_2 ∧  b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧ -p_802) -> break
c  in CNF:
c    -b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨  b^{1, 802}_0 ∨  p_802 ∨ break
c  in DIMACS:
-3566 -3567  3568  802 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 802}_2 ∧ -b^{1, 802}_1 ∧ -b^{1, 802}_0 ∧ true) 
c  in CNF:
c    -b^{1, 802}_2 ∨  b^{1, 802}_1 ∨  b^{1, 802}_0 ∨ false 
c  in DIMACS:
-3566  3567  3568  0

c  3 does not represent an automaton state.
c    -(-b^{1, 802}_2 ∧  b^{1, 802}_1 ∧  b^{1, 802}_0 ∧ true) 
c  in CNF:
c     b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ false 
c  in DIMACS:
 3566 -3567 -3568  0
c  -3 does not represent an automaton state.
c    -( b^{1, 802}_2 ∧  b^{1, 802}_1 ∧  b^{1, 802}_0 ∧ true) 
c  in CNF:
c    -b^{1, 802}_2 ∨ -b^{1, 802}_1 ∨ -b^{1, 802}_0 ∨ false 
c  in DIMACS:
-3566 -3567 -3568  0

c i = 803
c  -2+1 --> -1
c    ( b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧  p_803) -> ( b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0)
c  in CNF:
c    -b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨  b^{1, 804}_2
c    -b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_1
c    -b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨  b^{1, 804}_0
c  in DIMACS:
-3569 -3570  3571 -803  3572 0
-3569 -3570  3571 -803 -3573 0
-3569 -3570  3571 -803  3574 0

c  -1+1 --> 0
c    ( b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0 ∧  p_803) -> (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧ -b^{1, 804}_0)
c  in CNF:
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_2
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_1
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_0
c  in DIMACS:
-3569  3570 -3571 -803 -3572 0
-3569  3570 -3571 -803 -3573 0
-3569  3570 -3571 -803 -3574 0

c  0+1 --> 1
c    (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧  p_803) -> (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0)
c  in CNF:
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_2
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_1
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨  b^{1, 804}_0
c  in DIMACS:
 3569  3570  3571 -803 -3572 0
 3569  3570  3571 -803 -3573 0
 3569  3570  3571 -803  3574 0

c  1+1 --> 2
c    (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0 ∧  p_803) -> (-b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0)
c  in CNF:
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_2
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨  b^{1, 804}_1
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ -p_803 ∨ -b^{1, 804}_0
c  in DIMACS:
 3569  3570 -3571 -803 -3572 0
 3569  3570 -3571 -803  3573 0
 3569  3570 -3571 -803 -3574 0

c  2+1 --> break 
c    (-b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧  p_803) -> break
c  in CNF:
c     b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ -p_803 ∨ break
c  in DIMACS:
 3569 -3570  3571 -803 1162 0


c  2-1 --> 1
c    (-b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧ -p_803) -> (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0)
c  in CNF:
c     b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_2
c     b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_1
c     b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨  b^{1, 804}_0
c  in DIMACS:
 3569 -3570  3571  803 -3572 0
 3569 -3570  3571  803 -3573 0
 3569 -3570  3571  803  3574 0

c  1-1 --> 0
c    (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0 ∧ -p_803) -> (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧ -b^{1, 804}_0)
c  in CNF:
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_2
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_1
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_0
c  in DIMACS:
 3569  3570 -3571  803 -3572 0
 3569  3570 -3571  803 -3573 0
 3569  3570 -3571  803 -3574 0

c  0-1 --> -1
c    (-b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧ -p_803) -> ( b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0)
c  in CNF:
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨  b^{1, 804}_2
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_1
c     b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨  b^{1, 804}_0
c  in DIMACS:
 3569  3570  3571  803  3572 0
 3569  3570  3571  803 -3573 0
 3569  3570  3571  803  3574 0

c  -1-1 --> -2
c    ( b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧  b^{1, 803}_0 ∧ -p_803) -> ( b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0)
c  in CNF:
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨  b^{1, 804}_2
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨  b^{1, 804}_1
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨  p_803 ∨ -b^{1, 804}_0
c  in DIMACS:
-3569  3570 -3571  803  3572 0
-3569  3570 -3571  803  3573 0
-3569  3570 -3571  803 -3574 0

c  -2-1 --> break 
c    ( b^{1, 803}_2 ∧  b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧ -p_803) -> break
c  in CNF:
c    -b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨  b^{1, 803}_0 ∨  p_803 ∨ break
c  in DIMACS:
-3569 -3570  3571  803 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 803}_2 ∧ -b^{1, 803}_1 ∧ -b^{1, 803}_0 ∧ true) 
c  in CNF:
c    -b^{1, 803}_2 ∨  b^{1, 803}_1 ∨  b^{1, 803}_0 ∨ false 
c  in DIMACS:
-3569  3570  3571  0

c  3 does not represent an automaton state.
c    -(-b^{1, 803}_2 ∧  b^{1, 803}_1 ∧  b^{1, 803}_0 ∧ true) 
c  in CNF:
c     b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ false 
c  in DIMACS:
 3569 -3570 -3571  0
c  -3 does not represent an automaton state.
c    -( b^{1, 803}_2 ∧  b^{1, 803}_1 ∧  b^{1, 803}_0 ∧ true) 
c  in CNF:
c    -b^{1, 803}_2 ∨ -b^{1, 803}_1 ∨ -b^{1, 803}_0 ∨ false 
c  in DIMACS:
-3569 -3570 -3571  0

c i = 804
c  -2+1 --> -1
c    ( b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧  p_804) -> ( b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0)
c  in CNF:
c    -b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨  b^{1, 805}_2
c    -b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_1
c    -b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨  b^{1, 805}_0
c  in DIMACS:
-3572 -3573  3574 -804  3575 0
-3572 -3573  3574 -804 -3576 0
-3572 -3573  3574 -804  3577 0

c  -1+1 --> 0
c    ( b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0 ∧  p_804) -> (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧ -b^{1, 805}_0)
c  in CNF:
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_2
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_1
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_0
c  in DIMACS:
-3572  3573 -3574 -804 -3575 0
-3572  3573 -3574 -804 -3576 0
-3572  3573 -3574 -804 -3577 0

c  0+1 --> 1
c    (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧  p_804) -> (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0)
c  in CNF:
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_2
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_1
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨  b^{1, 805}_0
c  in DIMACS:
 3572  3573  3574 -804 -3575 0
 3572  3573  3574 -804 -3576 0
 3572  3573  3574 -804  3577 0

c  1+1 --> 2
c    (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0 ∧  p_804) -> (-b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0)
c  in CNF:
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_2
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨  b^{1, 805}_1
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ -p_804 ∨ -b^{1, 805}_0
c  in DIMACS:
 3572  3573 -3574 -804 -3575 0
 3572  3573 -3574 -804  3576 0
 3572  3573 -3574 -804 -3577 0

c  2+1 --> break 
c    (-b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧  p_804) -> break
c  in CNF:
c     b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 3572 -3573  3574 -804 1162 0


c  2-1 --> 1
c    (-b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧ -p_804) -> (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0)
c  in CNF:
c     b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_2
c     b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_1
c     b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨  b^{1, 805}_0
c  in DIMACS:
 3572 -3573  3574  804 -3575 0
 3572 -3573  3574  804 -3576 0
 3572 -3573  3574  804  3577 0

c  1-1 --> 0
c    (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0 ∧ -p_804) -> (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧ -b^{1, 805}_0)
c  in CNF:
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_2
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_1
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_0
c  in DIMACS:
 3572  3573 -3574  804 -3575 0
 3572  3573 -3574  804 -3576 0
 3572  3573 -3574  804 -3577 0

c  0-1 --> -1
c    (-b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧ -p_804) -> ( b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0)
c  in CNF:
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨  b^{1, 805}_2
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_1
c     b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨  b^{1, 805}_0
c  in DIMACS:
 3572  3573  3574  804  3575 0
 3572  3573  3574  804 -3576 0
 3572  3573  3574  804  3577 0

c  -1-1 --> -2
c    ( b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧  b^{1, 804}_0 ∧ -p_804) -> ( b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0)
c  in CNF:
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨  b^{1, 805}_2
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨  b^{1, 805}_1
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨  p_804 ∨ -b^{1, 805}_0
c  in DIMACS:
-3572  3573 -3574  804  3575 0
-3572  3573 -3574  804  3576 0
-3572  3573 -3574  804 -3577 0

c  -2-1 --> break 
c    ( b^{1, 804}_2 ∧  b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨  b^{1, 804}_0 ∨  p_804 ∨ break
c  in DIMACS:
-3572 -3573  3574  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 804}_2 ∧ -b^{1, 804}_1 ∧ -b^{1, 804}_0 ∧ true) 
c  in CNF:
c    -b^{1, 804}_2 ∨  b^{1, 804}_1 ∨  b^{1, 804}_0 ∨ false 
c  in DIMACS:
-3572  3573  3574  0

c  3 does not represent an automaton state.
c    -(-b^{1, 804}_2 ∧  b^{1, 804}_1 ∧  b^{1, 804}_0 ∧ true) 
c  in CNF:
c     b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ false 
c  in DIMACS:
 3572 -3573 -3574  0
c  -3 does not represent an automaton state.
c    -( b^{1, 804}_2 ∧  b^{1, 804}_1 ∧  b^{1, 804}_0 ∧ true) 
c  in CNF:
c    -b^{1, 804}_2 ∨ -b^{1, 804}_1 ∨ -b^{1, 804}_0 ∨ false 
c  in DIMACS:
-3572 -3573 -3574  0

c i = 805
c  -2+1 --> -1
c    ( b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧  p_805) -> ( b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0)
c  in CNF:
c    -b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨  b^{1, 806}_2
c    -b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_1
c    -b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨  b^{1, 806}_0
c  in DIMACS:
-3575 -3576  3577 -805  3578 0
-3575 -3576  3577 -805 -3579 0
-3575 -3576  3577 -805  3580 0

c  -1+1 --> 0
c    ( b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0 ∧  p_805) -> (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧ -b^{1, 806}_0)
c  in CNF:
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_2
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_1
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_0
c  in DIMACS:
-3575  3576 -3577 -805 -3578 0
-3575  3576 -3577 -805 -3579 0
-3575  3576 -3577 -805 -3580 0

c  0+1 --> 1
c    (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧  p_805) -> (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0)
c  in CNF:
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_2
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_1
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨  b^{1, 806}_0
c  in DIMACS:
 3575  3576  3577 -805 -3578 0
 3575  3576  3577 -805 -3579 0
 3575  3576  3577 -805  3580 0

c  1+1 --> 2
c    (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0 ∧  p_805) -> (-b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0)
c  in CNF:
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_2
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨  b^{1, 806}_1
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ -p_805 ∨ -b^{1, 806}_0
c  in DIMACS:
 3575  3576 -3577 -805 -3578 0
 3575  3576 -3577 -805  3579 0
 3575  3576 -3577 -805 -3580 0

c  2+1 --> break 
c    (-b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧  p_805) -> break
c  in CNF:
c     b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 3575 -3576  3577 -805 1162 0


c  2-1 --> 1
c    (-b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧ -p_805) -> (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0)
c  in CNF:
c     b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_2
c     b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_1
c     b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨  b^{1, 806}_0
c  in DIMACS:
 3575 -3576  3577  805 -3578 0
 3575 -3576  3577  805 -3579 0
 3575 -3576  3577  805  3580 0

c  1-1 --> 0
c    (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0 ∧ -p_805) -> (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧ -b^{1, 806}_0)
c  in CNF:
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_2
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_1
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_0
c  in DIMACS:
 3575  3576 -3577  805 -3578 0
 3575  3576 -3577  805 -3579 0
 3575  3576 -3577  805 -3580 0

c  0-1 --> -1
c    (-b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧ -p_805) -> ( b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0)
c  in CNF:
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨  b^{1, 806}_2
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_1
c     b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨  b^{1, 806}_0
c  in DIMACS:
 3575  3576  3577  805  3578 0
 3575  3576  3577  805 -3579 0
 3575  3576  3577  805  3580 0

c  -1-1 --> -2
c    ( b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧  b^{1, 805}_0 ∧ -p_805) -> ( b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0)
c  in CNF:
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨  b^{1, 806}_2
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨  b^{1, 806}_1
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨  p_805 ∨ -b^{1, 806}_0
c  in DIMACS:
-3575  3576 -3577  805  3578 0
-3575  3576 -3577  805  3579 0
-3575  3576 -3577  805 -3580 0

c  -2-1 --> break 
c    ( b^{1, 805}_2 ∧  b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨  b^{1, 805}_0 ∨  p_805 ∨ break
c  in DIMACS:
-3575 -3576  3577  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 805}_2 ∧ -b^{1, 805}_1 ∧ -b^{1, 805}_0 ∧ true) 
c  in CNF:
c    -b^{1, 805}_2 ∨  b^{1, 805}_1 ∨  b^{1, 805}_0 ∨ false 
c  in DIMACS:
-3575  3576  3577  0

c  3 does not represent an automaton state.
c    -(-b^{1, 805}_2 ∧  b^{1, 805}_1 ∧  b^{1, 805}_0 ∧ true) 
c  in CNF:
c     b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ false 
c  in DIMACS:
 3575 -3576 -3577  0
c  -3 does not represent an automaton state.
c    -( b^{1, 805}_2 ∧  b^{1, 805}_1 ∧  b^{1, 805}_0 ∧ true) 
c  in CNF:
c    -b^{1, 805}_2 ∨ -b^{1, 805}_1 ∨ -b^{1, 805}_0 ∨ false 
c  in DIMACS:
-3575 -3576 -3577  0

c i = 806
c  -2+1 --> -1
c    ( b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧  p_806) -> ( b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0)
c  in CNF:
c    -b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨  b^{1, 807}_2
c    -b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_1
c    -b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨  b^{1, 807}_0
c  in DIMACS:
-3578 -3579  3580 -806  3581 0
-3578 -3579  3580 -806 -3582 0
-3578 -3579  3580 -806  3583 0

c  -1+1 --> 0
c    ( b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0 ∧  p_806) -> (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧ -b^{1, 807}_0)
c  in CNF:
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_2
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_1
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_0
c  in DIMACS:
-3578  3579 -3580 -806 -3581 0
-3578  3579 -3580 -806 -3582 0
-3578  3579 -3580 -806 -3583 0

c  0+1 --> 1
c    (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧  p_806) -> (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0)
c  in CNF:
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_2
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_1
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨  b^{1, 807}_0
c  in DIMACS:
 3578  3579  3580 -806 -3581 0
 3578  3579  3580 -806 -3582 0
 3578  3579  3580 -806  3583 0

c  1+1 --> 2
c    (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0 ∧  p_806) -> (-b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0)
c  in CNF:
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_2
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨  b^{1, 807}_1
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ -p_806 ∨ -b^{1, 807}_0
c  in DIMACS:
 3578  3579 -3580 -806 -3581 0
 3578  3579 -3580 -806  3582 0
 3578  3579 -3580 -806 -3583 0

c  2+1 --> break 
c    (-b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧  p_806) -> break
c  in CNF:
c     b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 3578 -3579  3580 -806 1162 0


c  2-1 --> 1
c    (-b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧ -p_806) -> (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0)
c  in CNF:
c     b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_2
c     b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_1
c     b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨  b^{1, 807}_0
c  in DIMACS:
 3578 -3579  3580  806 -3581 0
 3578 -3579  3580  806 -3582 0
 3578 -3579  3580  806  3583 0

c  1-1 --> 0
c    (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0 ∧ -p_806) -> (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧ -b^{1, 807}_0)
c  in CNF:
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_2
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_1
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_0
c  in DIMACS:
 3578  3579 -3580  806 -3581 0
 3578  3579 -3580  806 -3582 0
 3578  3579 -3580  806 -3583 0

c  0-1 --> -1
c    (-b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧ -p_806) -> ( b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0)
c  in CNF:
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨  b^{1, 807}_2
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_1
c     b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨  b^{1, 807}_0
c  in DIMACS:
 3578  3579  3580  806  3581 0
 3578  3579  3580  806 -3582 0
 3578  3579  3580  806  3583 0

c  -1-1 --> -2
c    ( b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧  b^{1, 806}_0 ∧ -p_806) -> ( b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0)
c  in CNF:
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨  b^{1, 807}_2
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨  b^{1, 807}_1
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨  p_806 ∨ -b^{1, 807}_0
c  in DIMACS:
-3578  3579 -3580  806  3581 0
-3578  3579 -3580  806  3582 0
-3578  3579 -3580  806 -3583 0

c  -2-1 --> break 
c    ( b^{1, 806}_2 ∧  b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨  b^{1, 806}_0 ∨  p_806 ∨ break
c  in DIMACS:
-3578 -3579  3580  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 806}_2 ∧ -b^{1, 806}_1 ∧ -b^{1, 806}_0 ∧ true) 
c  in CNF:
c    -b^{1, 806}_2 ∨  b^{1, 806}_1 ∨  b^{1, 806}_0 ∨ false 
c  in DIMACS:
-3578  3579  3580  0

c  3 does not represent an automaton state.
c    -(-b^{1, 806}_2 ∧  b^{1, 806}_1 ∧  b^{1, 806}_0 ∧ true) 
c  in CNF:
c     b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ false 
c  in DIMACS:
 3578 -3579 -3580  0
c  -3 does not represent an automaton state.
c    -( b^{1, 806}_2 ∧  b^{1, 806}_1 ∧  b^{1, 806}_0 ∧ true) 
c  in CNF:
c    -b^{1, 806}_2 ∨ -b^{1, 806}_1 ∨ -b^{1, 806}_0 ∨ false 
c  in DIMACS:
-3578 -3579 -3580  0

c i = 807
c  -2+1 --> -1
c    ( b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧  p_807) -> ( b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0)
c  in CNF:
c    -b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨  b^{1, 808}_2
c    -b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_1
c    -b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨  b^{1, 808}_0
c  in DIMACS:
-3581 -3582  3583 -807  3584 0
-3581 -3582  3583 -807 -3585 0
-3581 -3582  3583 -807  3586 0

c  -1+1 --> 0
c    ( b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0 ∧  p_807) -> (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧ -b^{1, 808}_0)
c  in CNF:
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_2
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_1
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_0
c  in DIMACS:
-3581  3582 -3583 -807 -3584 0
-3581  3582 -3583 -807 -3585 0
-3581  3582 -3583 -807 -3586 0

c  0+1 --> 1
c    (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧  p_807) -> (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0)
c  in CNF:
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_2
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_1
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨  b^{1, 808}_0
c  in DIMACS:
 3581  3582  3583 -807 -3584 0
 3581  3582  3583 -807 -3585 0
 3581  3582  3583 -807  3586 0

c  1+1 --> 2
c    (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0 ∧  p_807) -> (-b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0)
c  in CNF:
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_2
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨  b^{1, 808}_1
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ -p_807 ∨ -b^{1, 808}_0
c  in DIMACS:
 3581  3582 -3583 -807 -3584 0
 3581  3582 -3583 -807  3585 0
 3581  3582 -3583 -807 -3586 0

c  2+1 --> break 
c    (-b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧  p_807) -> break
c  in CNF:
c     b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ -p_807 ∨ break
c  in DIMACS:
 3581 -3582  3583 -807 1162 0


c  2-1 --> 1
c    (-b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧ -p_807) -> (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0)
c  in CNF:
c     b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_2
c     b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_1
c     b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨  b^{1, 808}_0
c  in DIMACS:
 3581 -3582  3583  807 -3584 0
 3581 -3582  3583  807 -3585 0
 3581 -3582  3583  807  3586 0

c  1-1 --> 0
c    (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0 ∧ -p_807) -> (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧ -b^{1, 808}_0)
c  in CNF:
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_2
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_1
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_0
c  in DIMACS:
 3581  3582 -3583  807 -3584 0
 3581  3582 -3583  807 -3585 0
 3581  3582 -3583  807 -3586 0

c  0-1 --> -1
c    (-b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧ -p_807) -> ( b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0)
c  in CNF:
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨  b^{1, 808}_2
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_1
c     b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨  b^{1, 808}_0
c  in DIMACS:
 3581  3582  3583  807  3584 0
 3581  3582  3583  807 -3585 0
 3581  3582  3583  807  3586 0

c  -1-1 --> -2
c    ( b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧  b^{1, 807}_0 ∧ -p_807) -> ( b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0)
c  in CNF:
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨  b^{1, 808}_2
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨  b^{1, 808}_1
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨  p_807 ∨ -b^{1, 808}_0
c  in DIMACS:
-3581  3582 -3583  807  3584 0
-3581  3582 -3583  807  3585 0
-3581  3582 -3583  807 -3586 0

c  -2-1 --> break 
c    ( b^{1, 807}_2 ∧  b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧ -p_807) -> break
c  in CNF:
c    -b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨  b^{1, 807}_0 ∨  p_807 ∨ break
c  in DIMACS:
-3581 -3582  3583  807 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 807}_2 ∧ -b^{1, 807}_1 ∧ -b^{1, 807}_0 ∧ true) 
c  in CNF:
c    -b^{1, 807}_2 ∨  b^{1, 807}_1 ∨  b^{1, 807}_0 ∨ false 
c  in DIMACS:
-3581  3582  3583  0

c  3 does not represent an automaton state.
c    -(-b^{1, 807}_2 ∧  b^{1, 807}_1 ∧  b^{1, 807}_0 ∧ true) 
c  in CNF:
c     b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ false 
c  in DIMACS:
 3581 -3582 -3583  0
c  -3 does not represent an automaton state.
c    -( b^{1, 807}_2 ∧  b^{1, 807}_1 ∧  b^{1, 807}_0 ∧ true) 
c  in CNF:
c    -b^{1, 807}_2 ∨ -b^{1, 807}_1 ∨ -b^{1, 807}_0 ∨ false 
c  in DIMACS:
-3581 -3582 -3583  0

c i = 808
c  -2+1 --> -1
c    ( b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧  p_808) -> ( b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0)
c  in CNF:
c    -b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨  b^{1, 809}_2
c    -b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_1
c    -b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨  b^{1, 809}_0
c  in DIMACS:
-3584 -3585  3586 -808  3587 0
-3584 -3585  3586 -808 -3588 0
-3584 -3585  3586 -808  3589 0

c  -1+1 --> 0
c    ( b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0 ∧  p_808) -> (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧ -b^{1, 809}_0)
c  in CNF:
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_2
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_1
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_0
c  in DIMACS:
-3584  3585 -3586 -808 -3587 0
-3584  3585 -3586 -808 -3588 0
-3584  3585 -3586 -808 -3589 0

c  0+1 --> 1
c    (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧  p_808) -> (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0)
c  in CNF:
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_2
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_1
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨  b^{1, 809}_0
c  in DIMACS:
 3584  3585  3586 -808 -3587 0
 3584  3585  3586 -808 -3588 0
 3584  3585  3586 -808  3589 0

c  1+1 --> 2
c    (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0 ∧  p_808) -> (-b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0)
c  in CNF:
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_2
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨  b^{1, 809}_1
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ -p_808 ∨ -b^{1, 809}_0
c  in DIMACS:
 3584  3585 -3586 -808 -3587 0
 3584  3585 -3586 -808  3588 0
 3584  3585 -3586 -808 -3589 0

c  2+1 --> break 
c    (-b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧  p_808) -> break
c  in CNF:
c     b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 3584 -3585  3586 -808 1162 0


c  2-1 --> 1
c    (-b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧ -p_808) -> (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0)
c  in CNF:
c     b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_2
c     b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_1
c     b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨  b^{1, 809}_0
c  in DIMACS:
 3584 -3585  3586  808 -3587 0
 3584 -3585  3586  808 -3588 0
 3584 -3585  3586  808  3589 0

c  1-1 --> 0
c    (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0 ∧ -p_808) -> (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧ -b^{1, 809}_0)
c  in CNF:
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_2
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_1
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_0
c  in DIMACS:
 3584  3585 -3586  808 -3587 0
 3584  3585 -3586  808 -3588 0
 3584  3585 -3586  808 -3589 0

c  0-1 --> -1
c    (-b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧ -p_808) -> ( b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0)
c  in CNF:
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨  b^{1, 809}_2
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_1
c     b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨  b^{1, 809}_0
c  in DIMACS:
 3584  3585  3586  808  3587 0
 3584  3585  3586  808 -3588 0
 3584  3585  3586  808  3589 0

c  -1-1 --> -2
c    ( b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧  b^{1, 808}_0 ∧ -p_808) -> ( b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0)
c  in CNF:
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨  b^{1, 809}_2
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨  b^{1, 809}_1
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨  p_808 ∨ -b^{1, 809}_0
c  in DIMACS:
-3584  3585 -3586  808  3587 0
-3584  3585 -3586  808  3588 0
-3584  3585 -3586  808 -3589 0

c  -2-1 --> break 
c    ( b^{1, 808}_2 ∧  b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨  b^{1, 808}_0 ∨  p_808 ∨ break
c  in DIMACS:
-3584 -3585  3586  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 808}_2 ∧ -b^{1, 808}_1 ∧ -b^{1, 808}_0 ∧ true) 
c  in CNF:
c    -b^{1, 808}_2 ∨  b^{1, 808}_1 ∨  b^{1, 808}_0 ∨ false 
c  in DIMACS:
-3584  3585  3586  0

c  3 does not represent an automaton state.
c    -(-b^{1, 808}_2 ∧  b^{1, 808}_1 ∧  b^{1, 808}_0 ∧ true) 
c  in CNF:
c     b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ false 
c  in DIMACS:
 3584 -3585 -3586  0
c  -3 does not represent an automaton state.
c    -( b^{1, 808}_2 ∧  b^{1, 808}_1 ∧  b^{1, 808}_0 ∧ true) 
c  in CNF:
c    -b^{1, 808}_2 ∨ -b^{1, 808}_1 ∨ -b^{1, 808}_0 ∨ false 
c  in DIMACS:
-3584 -3585 -3586  0

c i = 809
c  -2+1 --> -1
c    ( b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧  p_809) -> ( b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0)
c  in CNF:
c    -b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨  b^{1, 810}_2
c    -b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_1
c    -b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨  b^{1, 810}_0
c  in DIMACS:
-3587 -3588  3589 -809  3590 0
-3587 -3588  3589 -809 -3591 0
-3587 -3588  3589 -809  3592 0

c  -1+1 --> 0
c    ( b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0 ∧  p_809) -> (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧ -b^{1, 810}_0)
c  in CNF:
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_2
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_1
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_0
c  in DIMACS:
-3587  3588 -3589 -809 -3590 0
-3587  3588 -3589 -809 -3591 0
-3587  3588 -3589 -809 -3592 0

c  0+1 --> 1
c    (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧  p_809) -> (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0)
c  in CNF:
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_2
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_1
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨  b^{1, 810}_0
c  in DIMACS:
 3587  3588  3589 -809 -3590 0
 3587  3588  3589 -809 -3591 0
 3587  3588  3589 -809  3592 0

c  1+1 --> 2
c    (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0 ∧  p_809) -> (-b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0)
c  in CNF:
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_2
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨  b^{1, 810}_1
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ -p_809 ∨ -b^{1, 810}_0
c  in DIMACS:
 3587  3588 -3589 -809 -3590 0
 3587  3588 -3589 -809  3591 0
 3587  3588 -3589 -809 -3592 0

c  2+1 --> break 
c    (-b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧  p_809) -> break
c  in CNF:
c     b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ -p_809 ∨ break
c  in DIMACS:
 3587 -3588  3589 -809 1162 0


c  2-1 --> 1
c    (-b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧ -p_809) -> (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0)
c  in CNF:
c     b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_2
c     b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_1
c     b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨  b^{1, 810}_0
c  in DIMACS:
 3587 -3588  3589  809 -3590 0
 3587 -3588  3589  809 -3591 0
 3587 -3588  3589  809  3592 0

c  1-1 --> 0
c    (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0 ∧ -p_809) -> (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧ -b^{1, 810}_0)
c  in CNF:
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_2
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_1
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_0
c  in DIMACS:
 3587  3588 -3589  809 -3590 0
 3587  3588 -3589  809 -3591 0
 3587  3588 -3589  809 -3592 0

c  0-1 --> -1
c    (-b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧ -p_809) -> ( b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0)
c  in CNF:
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨  b^{1, 810}_2
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_1
c     b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨  b^{1, 810}_0
c  in DIMACS:
 3587  3588  3589  809  3590 0
 3587  3588  3589  809 -3591 0
 3587  3588  3589  809  3592 0

c  -1-1 --> -2
c    ( b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧  b^{1, 809}_0 ∧ -p_809) -> ( b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0)
c  in CNF:
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨  b^{1, 810}_2
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨  b^{1, 810}_1
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨  p_809 ∨ -b^{1, 810}_0
c  in DIMACS:
-3587  3588 -3589  809  3590 0
-3587  3588 -3589  809  3591 0
-3587  3588 -3589  809 -3592 0

c  -2-1 --> break 
c    ( b^{1, 809}_2 ∧  b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧ -p_809) -> break
c  in CNF:
c    -b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨  b^{1, 809}_0 ∨  p_809 ∨ break
c  in DIMACS:
-3587 -3588  3589  809 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 809}_2 ∧ -b^{1, 809}_1 ∧ -b^{1, 809}_0 ∧ true) 
c  in CNF:
c    -b^{1, 809}_2 ∨  b^{1, 809}_1 ∨  b^{1, 809}_0 ∨ false 
c  in DIMACS:
-3587  3588  3589  0

c  3 does not represent an automaton state.
c    -(-b^{1, 809}_2 ∧  b^{1, 809}_1 ∧  b^{1, 809}_0 ∧ true) 
c  in CNF:
c     b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ false 
c  in DIMACS:
 3587 -3588 -3589  0
c  -3 does not represent an automaton state.
c    -( b^{1, 809}_2 ∧  b^{1, 809}_1 ∧  b^{1, 809}_0 ∧ true) 
c  in CNF:
c    -b^{1, 809}_2 ∨ -b^{1, 809}_1 ∨ -b^{1, 809}_0 ∨ false 
c  in DIMACS:
-3587 -3588 -3589  0

c i = 810
c  -2+1 --> -1
c    ( b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧  p_810) -> ( b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0)
c  in CNF:
c    -b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨  b^{1, 811}_2
c    -b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_1
c    -b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨  b^{1, 811}_0
c  in DIMACS:
-3590 -3591  3592 -810  3593 0
-3590 -3591  3592 -810 -3594 0
-3590 -3591  3592 -810  3595 0

c  -1+1 --> 0
c    ( b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0 ∧  p_810) -> (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧ -b^{1, 811}_0)
c  in CNF:
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_2
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_1
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_0
c  in DIMACS:
-3590  3591 -3592 -810 -3593 0
-3590  3591 -3592 -810 -3594 0
-3590  3591 -3592 -810 -3595 0

c  0+1 --> 1
c    (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧  p_810) -> (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0)
c  in CNF:
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_2
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_1
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨  b^{1, 811}_0
c  in DIMACS:
 3590  3591  3592 -810 -3593 0
 3590  3591  3592 -810 -3594 0
 3590  3591  3592 -810  3595 0

c  1+1 --> 2
c    (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0 ∧  p_810) -> (-b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0)
c  in CNF:
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_2
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨  b^{1, 811}_1
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ -p_810 ∨ -b^{1, 811}_0
c  in DIMACS:
 3590  3591 -3592 -810 -3593 0
 3590  3591 -3592 -810  3594 0
 3590  3591 -3592 -810 -3595 0

c  2+1 --> break 
c    (-b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧  p_810) -> break
c  in CNF:
c     b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 3590 -3591  3592 -810 1162 0


c  2-1 --> 1
c    (-b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧ -p_810) -> (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0)
c  in CNF:
c     b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_2
c     b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_1
c     b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨  b^{1, 811}_0
c  in DIMACS:
 3590 -3591  3592  810 -3593 0
 3590 -3591  3592  810 -3594 0
 3590 -3591  3592  810  3595 0

c  1-1 --> 0
c    (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0 ∧ -p_810) -> (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧ -b^{1, 811}_0)
c  in CNF:
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_2
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_1
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_0
c  in DIMACS:
 3590  3591 -3592  810 -3593 0
 3590  3591 -3592  810 -3594 0
 3590  3591 -3592  810 -3595 0

c  0-1 --> -1
c    (-b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧ -p_810) -> ( b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0)
c  in CNF:
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨  b^{1, 811}_2
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_1
c     b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨  b^{1, 811}_0
c  in DIMACS:
 3590  3591  3592  810  3593 0
 3590  3591  3592  810 -3594 0
 3590  3591  3592  810  3595 0

c  -1-1 --> -2
c    ( b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧  b^{1, 810}_0 ∧ -p_810) -> ( b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0)
c  in CNF:
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨  b^{1, 811}_2
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨  b^{1, 811}_1
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨  p_810 ∨ -b^{1, 811}_0
c  in DIMACS:
-3590  3591 -3592  810  3593 0
-3590  3591 -3592  810  3594 0
-3590  3591 -3592  810 -3595 0

c  -2-1 --> break 
c    ( b^{1, 810}_2 ∧  b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨  b^{1, 810}_0 ∨  p_810 ∨ break
c  in DIMACS:
-3590 -3591  3592  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 810}_2 ∧ -b^{1, 810}_1 ∧ -b^{1, 810}_0 ∧ true) 
c  in CNF:
c    -b^{1, 810}_2 ∨  b^{1, 810}_1 ∨  b^{1, 810}_0 ∨ false 
c  in DIMACS:
-3590  3591  3592  0

c  3 does not represent an automaton state.
c    -(-b^{1, 810}_2 ∧  b^{1, 810}_1 ∧  b^{1, 810}_0 ∧ true) 
c  in CNF:
c     b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ false 
c  in DIMACS:
 3590 -3591 -3592  0
c  -3 does not represent an automaton state.
c    -( b^{1, 810}_2 ∧  b^{1, 810}_1 ∧  b^{1, 810}_0 ∧ true) 
c  in CNF:
c    -b^{1, 810}_2 ∨ -b^{1, 810}_1 ∨ -b^{1, 810}_0 ∨ false 
c  in DIMACS:
-3590 -3591 -3592  0

c i = 811
c  -2+1 --> -1
c    ( b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧  p_811) -> ( b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0)
c  in CNF:
c    -b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨  b^{1, 812}_2
c    -b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_1
c    -b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨  b^{1, 812}_0
c  in DIMACS:
-3593 -3594  3595 -811  3596 0
-3593 -3594  3595 -811 -3597 0
-3593 -3594  3595 -811  3598 0

c  -1+1 --> 0
c    ( b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0 ∧  p_811) -> (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧ -b^{1, 812}_0)
c  in CNF:
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_2
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_1
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_0
c  in DIMACS:
-3593  3594 -3595 -811 -3596 0
-3593  3594 -3595 -811 -3597 0
-3593  3594 -3595 -811 -3598 0

c  0+1 --> 1
c    (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧  p_811) -> (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0)
c  in CNF:
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_2
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_1
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨  b^{1, 812}_0
c  in DIMACS:
 3593  3594  3595 -811 -3596 0
 3593  3594  3595 -811 -3597 0
 3593  3594  3595 -811  3598 0

c  1+1 --> 2
c    (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0 ∧  p_811) -> (-b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0)
c  in CNF:
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_2
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨  b^{1, 812}_1
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ -p_811 ∨ -b^{1, 812}_0
c  in DIMACS:
 3593  3594 -3595 -811 -3596 0
 3593  3594 -3595 -811  3597 0
 3593  3594 -3595 -811 -3598 0

c  2+1 --> break 
c    (-b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧  p_811) -> break
c  in CNF:
c     b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ -p_811 ∨ break
c  in DIMACS:
 3593 -3594  3595 -811 1162 0


c  2-1 --> 1
c    (-b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧ -p_811) -> (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0)
c  in CNF:
c     b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_2
c     b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_1
c     b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨  b^{1, 812}_0
c  in DIMACS:
 3593 -3594  3595  811 -3596 0
 3593 -3594  3595  811 -3597 0
 3593 -3594  3595  811  3598 0

c  1-1 --> 0
c    (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0 ∧ -p_811) -> (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧ -b^{1, 812}_0)
c  in CNF:
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_2
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_1
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_0
c  in DIMACS:
 3593  3594 -3595  811 -3596 0
 3593  3594 -3595  811 -3597 0
 3593  3594 -3595  811 -3598 0

c  0-1 --> -1
c    (-b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧ -p_811) -> ( b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0)
c  in CNF:
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨  b^{1, 812}_2
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_1
c     b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨  b^{1, 812}_0
c  in DIMACS:
 3593  3594  3595  811  3596 0
 3593  3594  3595  811 -3597 0
 3593  3594  3595  811  3598 0

c  -1-1 --> -2
c    ( b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧  b^{1, 811}_0 ∧ -p_811) -> ( b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0)
c  in CNF:
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨  b^{1, 812}_2
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨  b^{1, 812}_1
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨  p_811 ∨ -b^{1, 812}_0
c  in DIMACS:
-3593  3594 -3595  811  3596 0
-3593  3594 -3595  811  3597 0
-3593  3594 -3595  811 -3598 0

c  -2-1 --> break 
c    ( b^{1, 811}_2 ∧  b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧ -p_811) -> break
c  in CNF:
c    -b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨  b^{1, 811}_0 ∨  p_811 ∨ break
c  in DIMACS:
-3593 -3594  3595  811 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 811}_2 ∧ -b^{1, 811}_1 ∧ -b^{1, 811}_0 ∧ true) 
c  in CNF:
c    -b^{1, 811}_2 ∨  b^{1, 811}_1 ∨  b^{1, 811}_0 ∨ false 
c  in DIMACS:
-3593  3594  3595  0

c  3 does not represent an automaton state.
c    -(-b^{1, 811}_2 ∧  b^{1, 811}_1 ∧  b^{1, 811}_0 ∧ true) 
c  in CNF:
c     b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ false 
c  in DIMACS:
 3593 -3594 -3595  0
c  -3 does not represent an automaton state.
c    -( b^{1, 811}_2 ∧  b^{1, 811}_1 ∧  b^{1, 811}_0 ∧ true) 
c  in CNF:
c    -b^{1, 811}_2 ∨ -b^{1, 811}_1 ∨ -b^{1, 811}_0 ∨ false 
c  in DIMACS:
-3593 -3594 -3595  0

c i = 812
c  -2+1 --> -1
c    ( b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧  p_812) -> ( b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0)
c  in CNF:
c    -b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨  b^{1, 813}_2
c    -b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_1
c    -b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨  b^{1, 813}_0
c  in DIMACS:
-3596 -3597  3598 -812  3599 0
-3596 -3597  3598 -812 -3600 0
-3596 -3597  3598 -812  3601 0

c  -1+1 --> 0
c    ( b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0 ∧  p_812) -> (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧ -b^{1, 813}_0)
c  in CNF:
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_2
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_1
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_0
c  in DIMACS:
-3596  3597 -3598 -812 -3599 0
-3596  3597 -3598 -812 -3600 0
-3596  3597 -3598 -812 -3601 0

c  0+1 --> 1
c    (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧  p_812) -> (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0)
c  in CNF:
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_2
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_1
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨  b^{1, 813}_0
c  in DIMACS:
 3596  3597  3598 -812 -3599 0
 3596  3597  3598 -812 -3600 0
 3596  3597  3598 -812  3601 0

c  1+1 --> 2
c    (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0 ∧  p_812) -> (-b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0)
c  in CNF:
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_2
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨  b^{1, 813}_1
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ -p_812 ∨ -b^{1, 813}_0
c  in DIMACS:
 3596  3597 -3598 -812 -3599 0
 3596  3597 -3598 -812  3600 0
 3596  3597 -3598 -812 -3601 0

c  2+1 --> break 
c    (-b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧  p_812) -> break
c  in CNF:
c     b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 3596 -3597  3598 -812 1162 0


c  2-1 --> 1
c    (-b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧ -p_812) -> (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0)
c  in CNF:
c     b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_2
c     b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_1
c     b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨  b^{1, 813}_0
c  in DIMACS:
 3596 -3597  3598  812 -3599 0
 3596 -3597  3598  812 -3600 0
 3596 -3597  3598  812  3601 0

c  1-1 --> 0
c    (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0 ∧ -p_812) -> (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧ -b^{1, 813}_0)
c  in CNF:
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_2
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_1
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_0
c  in DIMACS:
 3596  3597 -3598  812 -3599 0
 3596  3597 -3598  812 -3600 0
 3596  3597 -3598  812 -3601 0

c  0-1 --> -1
c    (-b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧ -p_812) -> ( b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0)
c  in CNF:
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨  b^{1, 813}_2
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_1
c     b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨  b^{1, 813}_0
c  in DIMACS:
 3596  3597  3598  812  3599 0
 3596  3597  3598  812 -3600 0
 3596  3597  3598  812  3601 0

c  -1-1 --> -2
c    ( b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧  b^{1, 812}_0 ∧ -p_812) -> ( b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0)
c  in CNF:
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨  b^{1, 813}_2
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨  b^{1, 813}_1
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨  p_812 ∨ -b^{1, 813}_0
c  in DIMACS:
-3596  3597 -3598  812  3599 0
-3596  3597 -3598  812  3600 0
-3596  3597 -3598  812 -3601 0

c  -2-1 --> break 
c    ( b^{1, 812}_2 ∧  b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨  b^{1, 812}_0 ∨  p_812 ∨ break
c  in DIMACS:
-3596 -3597  3598  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 812}_2 ∧ -b^{1, 812}_1 ∧ -b^{1, 812}_0 ∧ true) 
c  in CNF:
c    -b^{1, 812}_2 ∨  b^{1, 812}_1 ∨  b^{1, 812}_0 ∨ false 
c  in DIMACS:
-3596  3597  3598  0

c  3 does not represent an automaton state.
c    -(-b^{1, 812}_2 ∧  b^{1, 812}_1 ∧  b^{1, 812}_0 ∧ true) 
c  in CNF:
c     b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ false 
c  in DIMACS:
 3596 -3597 -3598  0
c  -3 does not represent an automaton state.
c    -( b^{1, 812}_2 ∧  b^{1, 812}_1 ∧  b^{1, 812}_0 ∧ true) 
c  in CNF:
c    -b^{1, 812}_2 ∨ -b^{1, 812}_1 ∨ -b^{1, 812}_0 ∨ false 
c  in DIMACS:
-3596 -3597 -3598  0

c i = 813
c  -2+1 --> -1
c    ( b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧  p_813) -> ( b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0)
c  in CNF:
c    -b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨  b^{1, 814}_2
c    -b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_1
c    -b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨  b^{1, 814}_0
c  in DIMACS:
-3599 -3600  3601 -813  3602 0
-3599 -3600  3601 -813 -3603 0
-3599 -3600  3601 -813  3604 0

c  -1+1 --> 0
c    ( b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0 ∧  p_813) -> (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧ -b^{1, 814}_0)
c  in CNF:
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_2
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_1
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_0
c  in DIMACS:
-3599  3600 -3601 -813 -3602 0
-3599  3600 -3601 -813 -3603 0
-3599  3600 -3601 -813 -3604 0

c  0+1 --> 1
c    (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧  p_813) -> (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0)
c  in CNF:
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_2
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_1
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨  b^{1, 814}_0
c  in DIMACS:
 3599  3600  3601 -813 -3602 0
 3599  3600  3601 -813 -3603 0
 3599  3600  3601 -813  3604 0

c  1+1 --> 2
c    (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0 ∧  p_813) -> (-b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0)
c  in CNF:
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_2
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨  b^{1, 814}_1
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ -p_813 ∨ -b^{1, 814}_0
c  in DIMACS:
 3599  3600 -3601 -813 -3602 0
 3599  3600 -3601 -813  3603 0
 3599  3600 -3601 -813 -3604 0

c  2+1 --> break 
c    (-b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧  p_813) -> break
c  in CNF:
c     b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ -p_813 ∨ break
c  in DIMACS:
 3599 -3600  3601 -813 1162 0


c  2-1 --> 1
c    (-b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧ -p_813) -> (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0)
c  in CNF:
c     b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_2
c     b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_1
c     b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨  b^{1, 814}_0
c  in DIMACS:
 3599 -3600  3601  813 -3602 0
 3599 -3600  3601  813 -3603 0
 3599 -3600  3601  813  3604 0

c  1-1 --> 0
c    (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0 ∧ -p_813) -> (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧ -b^{1, 814}_0)
c  in CNF:
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_2
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_1
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_0
c  in DIMACS:
 3599  3600 -3601  813 -3602 0
 3599  3600 -3601  813 -3603 0
 3599  3600 -3601  813 -3604 0

c  0-1 --> -1
c    (-b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧ -p_813) -> ( b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0)
c  in CNF:
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨  b^{1, 814}_2
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_1
c     b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨  b^{1, 814}_0
c  in DIMACS:
 3599  3600  3601  813  3602 0
 3599  3600  3601  813 -3603 0
 3599  3600  3601  813  3604 0

c  -1-1 --> -2
c    ( b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧  b^{1, 813}_0 ∧ -p_813) -> ( b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0)
c  in CNF:
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨  b^{1, 814}_2
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨  b^{1, 814}_1
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨  p_813 ∨ -b^{1, 814}_0
c  in DIMACS:
-3599  3600 -3601  813  3602 0
-3599  3600 -3601  813  3603 0
-3599  3600 -3601  813 -3604 0

c  -2-1 --> break 
c    ( b^{1, 813}_2 ∧  b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧ -p_813) -> break
c  in CNF:
c    -b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨  b^{1, 813}_0 ∨  p_813 ∨ break
c  in DIMACS:
-3599 -3600  3601  813 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 813}_2 ∧ -b^{1, 813}_1 ∧ -b^{1, 813}_0 ∧ true) 
c  in CNF:
c    -b^{1, 813}_2 ∨  b^{1, 813}_1 ∨  b^{1, 813}_0 ∨ false 
c  in DIMACS:
-3599  3600  3601  0

c  3 does not represent an automaton state.
c    -(-b^{1, 813}_2 ∧  b^{1, 813}_1 ∧  b^{1, 813}_0 ∧ true) 
c  in CNF:
c     b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ false 
c  in DIMACS:
 3599 -3600 -3601  0
c  -3 does not represent an automaton state.
c    -( b^{1, 813}_2 ∧  b^{1, 813}_1 ∧  b^{1, 813}_0 ∧ true) 
c  in CNF:
c    -b^{1, 813}_2 ∨ -b^{1, 813}_1 ∨ -b^{1, 813}_0 ∨ false 
c  in DIMACS:
-3599 -3600 -3601  0

c i = 814
c  -2+1 --> -1
c    ( b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧  p_814) -> ( b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0)
c  in CNF:
c    -b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨  b^{1, 815}_2
c    -b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_1
c    -b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨  b^{1, 815}_0
c  in DIMACS:
-3602 -3603  3604 -814  3605 0
-3602 -3603  3604 -814 -3606 0
-3602 -3603  3604 -814  3607 0

c  -1+1 --> 0
c    ( b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0 ∧  p_814) -> (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧ -b^{1, 815}_0)
c  in CNF:
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_2
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_1
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_0
c  in DIMACS:
-3602  3603 -3604 -814 -3605 0
-3602  3603 -3604 -814 -3606 0
-3602  3603 -3604 -814 -3607 0

c  0+1 --> 1
c    (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧  p_814) -> (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0)
c  in CNF:
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_2
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_1
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨  b^{1, 815}_0
c  in DIMACS:
 3602  3603  3604 -814 -3605 0
 3602  3603  3604 -814 -3606 0
 3602  3603  3604 -814  3607 0

c  1+1 --> 2
c    (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0 ∧  p_814) -> (-b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0)
c  in CNF:
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_2
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨  b^{1, 815}_1
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ -p_814 ∨ -b^{1, 815}_0
c  in DIMACS:
 3602  3603 -3604 -814 -3605 0
 3602  3603 -3604 -814  3606 0
 3602  3603 -3604 -814 -3607 0

c  2+1 --> break 
c    (-b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧  p_814) -> break
c  in CNF:
c     b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 3602 -3603  3604 -814 1162 0


c  2-1 --> 1
c    (-b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧ -p_814) -> (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0)
c  in CNF:
c     b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_2
c     b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_1
c     b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨  b^{1, 815}_0
c  in DIMACS:
 3602 -3603  3604  814 -3605 0
 3602 -3603  3604  814 -3606 0
 3602 -3603  3604  814  3607 0

c  1-1 --> 0
c    (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0 ∧ -p_814) -> (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧ -b^{1, 815}_0)
c  in CNF:
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_2
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_1
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_0
c  in DIMACS:
 3602  3603 -3604  814 -3605 0
 3602  3603 -3604  814 -3606 0
 3602  3603 -3604  814 -3607 0

c  0-1 --> -1
c    (-b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧ -p_814) -> ( b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0)
c  in CNF:
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨  b^{1, 815}_2
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_1
c     b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨  b^{1, 815}_0
c  in DIMACS:
 3602  3603  3604  814  3605 0
 3602  3603  3604  814 -3606 0
 3602  3603  3604  814  3607 0

c  -1-1 --> -2
c    ( b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧  b^{1, 814}_0 ∧ -p_814) -> ( b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0)
c  in CNF:
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨  b^{1, 815}_2
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨  b^{1, 815}_1
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨  p_814 ∨ -b^{1, 815}_0
c  in DIMACS:
-3602  3603 -3604  814  3605 0
-3602  3603 -3604  814  3606 0
-3602  3603 -3604  814 -3607 0

c  -2-1 --> break 
c    ( b^{1, 814}_2 ∧  b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨  b^{1, 814}_0 ∨  p_814 ∨ break
c  in DIMACS:
-3602 -3603  3604  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 814}_2 ∧ -b^{1, 814}_1 ∧ -b^{1, 814}_0 ∧ true) 
c  in CNF:
c    -b^{1, 814}_2 ∨  b^{1, 814}_1 ∨  b^{1, 814}_0 ∨ false 
c  in DIMACS:
-3602  3603  3604  0

c  3 does not represent an automaton state.
c    -(-b^{1, 814}_2 ∧  b^{1, 814}_1 ∧  b^{1, 814}_0 ∧ true) 
c  in CNF:
c     b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ false 
c  in DIMACS:
 3602 -3603 -3604  0
c  -3 does not represent an automaton state.
c    -( b^{1, 814}_2 ∧  b^{1, 814}_1 ∧  b^{1, 814}_0 ∧ true) 
c  in CNF:
c    -b^{1, 814}_2 ∨ -b^{1, 814}_1 ∨ -b^{1, 814}_0 ∨ false 
c  in DIMACS:
-3602 -3603 -3604  0

c i = 815
c  -2+1 --> -1
c    ( b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧  p_815) -> ( b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0)
c  in CNF:
c    -b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨  b^{1, 816}_2
c    -b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_1
c    -b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨  b^{1, 816}_0
c  in DIMACS:
-3605 -3606  3607 -815  3608 0
-3605 -3606  3607 -815 -3609 0
-3605 -3606  3607 -815  3610 0

c  -1+1 --> 0
c    ( b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0 ∧  p_815) -> (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧ -b^{1, 816}_0)
c  in CNF:
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_2
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_1
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_0
c  in DIMACS:
-3605  3606 -3607 -815 -3608 0
-3605  3606 -3607 -815 -3609 0
-3605  3606 -3607 -815 -3610 0

c  0+1 --> 1
c    (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧  p_815) -> (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0)
c  in CNF:
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_2
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_1
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨  b^{1, 816}_0
c  in DIMACS:
 3605  3606  3607 -815 -3608 0
 3605  3606  3607 -815 -3609 0
 3605  3606  3607 -815  3610 0

c  1+1 --> 2
c    (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0 ∧  p_815) -> (-b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0)
c  in CNF:
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_2
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨  b^{1, 816}_1
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ -p_815 ∨ -b^{1, 816}_0
c  in DIMACS:
 3605  3606 -3607 -815 -3608 0
 3605  3606 -3607 -815  3609 0
 3605  3606 -3607 -815 -3610 0

c  2+1 --> break 
c    (-b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧  p_815) -> break
c  in CNF:
c     b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ -p_815 ∨ break
c  in DIMACS:
 3605 -3606  3607 -815 1162 0


c  2-1 --> 1
c    (-b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧ -p_815) -> (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0)
c  in CNF:
c     b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_2
c     b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_1
c     b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨  b^{1, 816}_0
c  in DIMACS:
 3605 -3606  3607  815 -3608 0
 3605 -3606  3607  815 -3609 0
 3605 -3606  3607  815  3610 0

c  1-1 --> 0
c    (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0 ∧ -p_815) -> (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧ -b^{1, 816}_0)
c  in CNF:
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_2
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_1
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_0
c  in DIMACS:
 3605  3606 -3607  815 -3608 0
 3605  3606 -3607  815 -3609 0
 3605  3606 -3607  815 -3610 0

c  0-1 --> -1
c    (-b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧ -p_815) -> ( b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0)
c  in CNF:
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨  b^{1, 816}_2
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_1
c     b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨  b^{1, 816}_0
c  in DIMACS:
 3605  3606  3607  815  3608 0
 3605  3606  3607  815 -3609 0
 3605  3606  3607  815  3610 0

c  -1-1 --> -2
c    ( b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧  b^{1, 815}_0 ∧ -p_815) -> ( b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0)
c  in CNF:
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨  b^{1, 816}_2
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨  b^{1, 816}_1
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨  p_815 ∨ -b^{1, 816}_0
c  in DIMACS:
-3605  3606 -3607  815  3608 0
-3605  3606 -3607  815  3609 0
-3605  3606 -3607  815 -3610 0

c  -2-1 --> break 
c    ( b^{1, 815}_2 ∧  b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧ -p_815) -> break
c  in CNF:
c    -b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨  b^{1, 815}_0 ∨  p_815 ∨ break
c  in DIMACS:
-3605 -3606  3607  815 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 815}_2 ∧ -b^{1, 815}_1 ∧ -b^{1, 815}_0 ∧ true) 
c  in CNF:
c    -b^{1, 815}_2 ∨  b^{1, 815}_1 ∨  b^{1, 815}_0 ∨ false 
c  in DIMACS:
-3605  3606  3607  0

c  3 does not represent an automaton state.
c    -(-b^{1, 815}_2 ∧  b^{1, 815}_1 ∧  b^{1, 815}_0 ∧ true) 
c  in CNF:
c     b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ false 
c  in DIMACS:
 3605 -3606 -3607  0
c  -3 does not represent an automaton state.
c    -( b^{1, 815}_2 ∧  b^{1, 815}_1 ∧  b^{1, 815}_0 ∧ true) 
c  in CNF:
c    -b^{1, 815}_2 ∨ -b^{1, 815}_1 ∨ -b^{1, 815}_0 ∨ false 
c  in DIMACS:
-3605 -3606 -3607  0

c i = 816
c  -2+1 --> -1
c    ( b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧  p_816) -> ( b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0)
c  in CNF:
c    -b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨  b^{1, 817}_2
c    -b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_1
c    -b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨  b^{1, 817}_0
c  in DIMACS:
-3608 -3609  3610 -816  3611 0
-3608 -3609  3610 -816 -3612 0
-3608 -3609  3610 -816  3613 0

c  -1+1 --> 0
c    ( b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0 ∧  p_816) -> (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧ -b^{1, 817}_0)
c  in CNF:
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_2
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_1
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_0
c  in DIMACS:
-3608  3609 -3610 -816 -3611 0
-3608  3609 -3610 -816 -3612 0
-3608  3609 -3610 -816 -3613 0

c  0+1 --> 1
c    (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧  p_816) -> (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0)
c  in CNF:
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_2
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_1
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨  b^{1, 817}_0
c  in DIMACS:
 3608  3609  3610 -816 -3611 0
 3608  3609  3610 -816 -3612 0
 3608  3609  3610 -816  3613 0

c  1+1 --> 2
c    (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0 ∧  p_816) -> (-b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0)
c  in CNF:
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_2
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨  b^{1, 817}_1
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ -p_816 ∨ -b^{1, 817}_0
c  in DIMACS:
 3608  3609 -3610 -816 -3611 0
 3608  3609 -3610 -816  3612 0
 3608  3609 -3610 -816 -3613 0

c  2+1 --> break 
c    (-b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧  p_816) -> break
c  in CNF:
c     b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 3608 -3609  3610 -816 1162 0


c  2-1 --> 1
c    (-b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧ -p_816) -> (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0)
c  in CNF:
c     b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_2
c     b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_1
c     b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨  b^{1, 817}_0
c  in DIMACS:
 3608 -3609  3610  816 -3611 0
 3608 -3609  3610  816 -3612 0
 3608 -3609  3610  816  3613 0

c  1-1 --> 0
c    (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0 ∧ -p_816) -> (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧ -b^{1, 817}_0)
c  in CNF:
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_2
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_1
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_0
c  in DIMACS:
 3608  3609 -3610  816 -3611 0
 3608  3609 -3610  816 -3612 0
 3608  3609 -3610  816 -3613 0

c  0-1 --> -1
c    (-b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧ -p_816) -> ( b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0)
c  in CNF:
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨  b^{1, 817}_2
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_1
c     b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨  b^{1, 817}_0
c  in DIMACS:
 3608  3609  3610  816  3611 0
 3608  3609  3610  816 -3612 0
 3608  3609  3610  816  3613 0

c  -1-1 --> -2
c    ( b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧  b^{1, 816}_0 ∧ -p_816) -> ( b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0)
c  in CNF:
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨  b^{1, 817}_2
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨  b^{1, 817}_1
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨  p_816 ∨ -b^{1, 817}_0
c  in DIMACS:
-3608  3609 -3610  816  3611 0
-3608  3609 -3610  816  3612 0
-3608  3609 -3610  816 -3613 0

c  -2-1 --> break 
c    ( b^{1, 816}_2 ∧  b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨  b^{1, 816}_0 ∨  p_816 ∨ break
c  in DIMACS:
-3608 -3609  3610  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 816}_2 ∧ -b^{1, 816}_1 ∧ -b^{1, 816}_0 ∧ true) 
c  in CNF:
c    -b^{1, 816}_2 ∨  b^{1, 816}_1 ∨  b^{1, 816}_0 ∨ false 
c  in DIMACS:
-3608  3609  3610  0

c  3 does not represent an automaton state.
c    -(-b^{1, 816}_2 ∧  b^{1, 816}_1 ∧  b^{1, 816}_0 ∧ true) 
c  in CNF:
c     b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ false 
c  in DIMACS:
 3608 -3609 -3610  0
c  -3 does not represent an automaton state.
c    -( b^{1, 816}_2 ∧  b^{1, 816}_1 ∧  b^{1, 816}_0 ∧ true) 
c  in CNF:
c    -b^{1, 816}_2 ∨ -b^{1, 816}_1 ∨ -b^{1, 816}_0 ∨ false 
c  in DIMACS:
-3608 -3609 -3610  0

c i = 817
c  -2+1 --> -1
c    ( b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧  p_817) -> ( b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0)
c  in CNF:
c    -b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨  b^{1, 818}_2
c    -b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_1
c    -b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨  b^{1, 818}_0
c  in DIMACS:
-3611 -3612  3613 -817  3614 0
-3611 -3612  3613 -817 -3615 0
-3611 -3612  3613 -817  3616 0

c  -1+1 --> 0
c    ( b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0 ∧  p_817) -> (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧ -b^{1, 818}_0)
c  in CNF:
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_2
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_1
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_0
c  in DIMACS:
-3611  3612 -3613 -817 -3614 0
-3611  3612 -3613 -817 -3615 0
-3611  3612 -3613 -817 -3616 0

c  0+1 --> 1
c    (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧  p_817) -> (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0)
c  in CNF:
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_2
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_1
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨  b^{1, 818}_0
c  in DIMACS:
 3611  3612  3613 -817 -3614 0
 3611  3612  3613 -817 -3615 0
 3611  3612  3613 -817  3616 0

c  1+1 --> 2
c    (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0 ∧  p_817) -> (-b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0)
c  in CNF:
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_2
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨  b^{1, 818}_1
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ -p_817 ∨ -b^{1, 818}_0
c  in DIMACS:
 3611  3612 -3613 -817 -3614 0
 3611  3612 -3613 -817  3615 0
 3611  3612 -3613 -817 -3616 0

c  2+1 --> break 
c    (-b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧  p_817) -> break
c  in CNF:
c     b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ -p_817 ∨ break
c  in DIMACS:
 3611 -3612  3613 -817 1162 0


c  2-1 --> 1
c    (-b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧ -p_817) -> (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0)
c  in CNF:
c     b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_2
c     b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_1
c     b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨  b^{1, 818}_0
c  in DIMACS:
 3611 -3612  3613  817 -3614 0
 3611 -3612  3613  817 -3615 0
 3611 -3612  3613  817  3616 0

c  1-1 --> 0
c    (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0 ∧ -p_817) -> (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧ -b^{1, 818}_0)
c  in CNF:
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_2
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_1
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_0
c  in DIMACS:
 3611  3612 -3613  817 -3614 0
 3611  3612 -3613  817 -3615 0
 3611  3612 -3613  817 -3616 0

c  0-1 --> -1
c    (-b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧ -p_817) -> ( b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0)
c  in CNF:
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨  b^{1, 818}_2
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_1
c     b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨  b^{1, 818}_0
c  in DIMACS:
 3611  3612  3613  817  3614 0
 3611  3612  3613  817 -3615 0
 3611  3612  3613  817  3616 0

c  -1-1 --> -2
c    ( b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧  b^{1, 817}_0 ∧ -p_817) -> ( b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0)
c  in CNF:
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨  b^{1, 818}_2
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨  b^{1, 818}_1
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨  p_817 ∨ -b^{1, 818}_0
c  in DIMACS:
-3611  3612 -3613  817  3614 0
-3611  3612 -3613  817  3615 0
-3611  3612 -3613  817 -3616 0

c  -2-1 --> break 
c    ( b^{1, 817}_2 ∧  b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧ -p_817) -> break
c  in CNF:
c    -b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨  b^{1, 817}_0 ∨  p_817 ∨ break
c  in DIMACS:
-3611 -3612  3613  817 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 817}_2 ∧ -b^{1, 817}_1 ∧ -b^{1, 817}_0 ∧ true) 
c  in CNF:
c    -b^{1, 817}_2 ∨  b^{1, 817}_1 ∨  b^{1, 817}_0 ∨ false 
c  in DIMACS:
-3611  3612  3613  0

c  3 does not represent an automaton state.
c    -(-b^{1, 817}_2 ∧  b^{1, 817}_1 ∧  b^{1, 817}_0 ∧ true) 
c  in CNF:
c     b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ false 
c  in DIMACS:
 3611 -3612 -3613  0
c  -3 does not represent an automaton state.
c    -( b^{1, 817}_2 ∧  b^{1, 817}_1 ∧  b^{1, 817}_0 ∧ true) 
c  in CNF:
c    -b^{1, 817}_2 ∨ -b^{1, 817}_1 ∨ -b^{1, 817}_0 ∨ false 
c  in DIMACS:
-3611 -3612 -3613  0

c i = 818
c  -2+1 --> -1
c    ( b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧  p_818) -> ( b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0)
c  in CNF:
c    -b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨  b^{1, 819}_2
c    -b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_1
c    -b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨  b^{1, 819}_0
c  in DIMACS:
-3614 -3615  3616 -818  3617 0
-3614 -3615  3616 -818 -3618 0
-3614 -3615  3616 -818  3619 0

c  -1+1 --> 0
c    ( b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0 ∧  p_818) -> (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧ -b^{1, 819}_0)
c  in CNF:
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_2
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_1
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_0
c  in DIMACS:
-3614  3615 -3616 -818 -3617 0
-3614  3615 -3616 -818 -3618 0
-3614  3615 -3616 -818 -3619 0

c  0+1 --> 1
c    (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧  p_818) -> (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0)
c  in CNF:
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_2
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_1
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨  b^{1, 819}_0
c  in DIMACS:
 3614  3615  3616 -818 -3617 0
 3614  3615  3616 -818 -3618 0
 3614  3615  3616 -818  3619 0

c  1+1 --> 2
c    (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0 ∧  p_818) -> (-b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0)
c  in CNF:
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_2
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨  b^{1, 819}_1
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ -p_818 ∨ -b^{1, 819}_0
c  in DIMACS:
 3614  3615 -3616 -818 -3617 0
 3614  3615 -3616 -818  3618 0
 3614  3615 -3616 -818 -3619 0

c  2+1 --> break 
c    (-b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧  p_818) -> break
c  in CNF:
c     b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ -p_818 ∨ break
c  in DIMACS:
 3614 -3615  3616 -818 1162 0


c  2-1 --> 1
c    (-b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧ -p_818) -> (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0)
c  in CNF:
c     b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_2
c     b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_1
c     b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨  b^{1, 819}_0
c  in DIMACS:
 3614 -3615  3616  818 -3617 0
 3614 -3615  3616  818 -3618 0
 3614 -3615  3616  818  3619 0

c  1-1 --> 0
c    (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0 ∧ -p_818) -> (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧ -b^{1, 819}_0)
c  in CNF:
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_2
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_1
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_0
c  in DIMACS:
 3614  3615 -3616  818 -3617 0
 3614  3615 -3616  818 -3618 0
 3614  3615 -3616  818 -3619 0

c  0-1 --> -1
c    (-b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧ -p_818) -> ( b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0)
c  in CNF:
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨  b^{1, 819}_2
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_1
c     b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨  b^{1, 819}_0
c  in DIMACS:
 3614  3615  3616  818  3617 0
 3614  3615  3616  818 -3618 0
 3614  3615  3616  818  3619 0

c  -1-1 --> -2
c    ( b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧  b^{1, 818}_0 ∧ -p_818) -> ( b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0)
c  in CNF:
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨  b^{1, 819}_2
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨  b^{1, 819}_1
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨  p_818 ∨ -b^{1, 819}_0
c  in DIMACS:
-3614  3615 -3616  818  3617 0
-3614  3615 -3616  818  3618 0
-3614  3615 -3616  818 -3619 0

c  -2-1 --> break 
c    ( b^{1, 818}_2 ∧  b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧ -p_818) -> break
c  in CNF:
c    -b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨  b^{1, 818}_0 ∨  p_818 ∨ break
c  in DIMACS:
-3614 -3615  3616  818 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 818}_2 ∧ -b^{1, 818}_1 ∧ -b^{1, 818}_0 ∧ true) 
c  in CNF:
c    -b^{1, 818}_2 ∨  b^{1, 818}_1 ∨  b^{1, 818}_0 ∨ false 
c  in DIMACS:
-3614  3615  3616  0

c  3 does not represent an automaton state.
c    -(-b^{1, 818}_2 ∧  b^{1, 818}_1 ∧  b^{1, 818}_0 ∧ true) 
c  in CNF:
c     b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ false 
c  in DIMACS:
 3614 -3615 -3616  0
c  -3 does not represent an automaton state.
c    -( b^{1, 818}_2 ∧  b^{1, 818}_1 ∧  b^{1, 818}_0 ∧ true) 
c  in CNF:
c    -b^{1, 818}_2 ∨ -b^{1, 818}_1 ∨ -b^{1, 818}_0 ∨ false 
c  in DIMACS:
-3614 -3615 -3616  0

c i = 819
c  -2+1 --> -1
c    ( b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧  p_819) -> ( b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0)
c  in CNF:
c    -b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨  b^{1, 820}_2
c    -b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_1
c    -b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨  b^{1, 820}_0
c  in DIMACS:
-3617 -3618  3619 -819  3620 0
-3617 -3618  3619 -819 -3621 0
-3617 -3618  3619 -819  3622 0

c  -1+1 --> 0
c    ( b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0 ∧  p_819) -> (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧ -b^{1, 820}_0)
c  in CNF:
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_2
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_1
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_0
c  in DIMACS:
-3617  3618 -3619 -819 -3620 0
-3617  3618 -3619 -819 -3621 0
-3617  3618 -3619 -819 -3622 0

c  0+1 --> 1
c    (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧  p_819) -> (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0)
c  in CNF:
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_2
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_1
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨  b^{1, 820}_0
c  in DIMACS:
 3617  3618  3619 -819 -3620 0
 3617  3618  3619 -819 -3621 0
 3617  3618  3619 -819  3622 0

c  1+1 --> 2
c    (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0 ∧  p_819) -> (-b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0)
c  in CNF:
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_2
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨  b^{1, 820}_1
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ -p_819 ∨ -b^{1, 820}_0
c  in DIMACS:
 3617  3618 -3619 -819 -3620 0
 3617  3618 -3619 -819  3621 0
 3617  3618 -3619 -819 -3622 0

c  2+1 --> break 
c    (-b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧  p_819) -> break
c  in CNF:
c     b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 3617 -3618  3619 -819 1162 0


c  2-1 --> 1
c    (-b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧ -p_819) -> (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0)
c  in CNF:
c     b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_2
c     b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_1
c     b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨  b^{1, 820}_0
c  in DIMACS:
 3617 -3618  3619  819 -3620 0
 3617 -3618  3619  819 -3621 0
 3617 -3618  3619  819  3622 0

c  1-1 --> 0
c    (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0 ∧ -p_819) -> (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧ -b^{1, 820}_0)
c  in CNF:
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_2
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_1
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_0
c  in DIMACS:
 3617  3618 -3619  819 -3620 0
 3617  3618 -3619  819 -3621 0
 3617  3618 -3619  819 -3622 0

c  0-1 --> -1
c    (-b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧ -p_819) -> ( b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0)
c  in CNF:
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨  b^{1, 820}_2
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_1
c     b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨  b^{1, 820}_0
c  in DIMACS:
 3617  3618  3619  819  3620 0
 3617  3618  3619  819 -3621 0
 3617  3618  3619  819  3622 0

c  -1-1 --> -2
c    ( b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧  b^{1, 819}_0 ∧ -p_819) -> ( b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0)
c  in CNF:
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨  b^{1, 820}_2
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨  b^{1, 820}_1
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨  p_819 ∨ -b^{1, 820}_0
c  in DIMACS:
-3617  3618 -3619  819  3620 0
-3617  3618 -3619  819  3621 0
-3617  3618 -3619  819 -3622 0

c  -2-1 --> break 
c    ( b^{1, 819}_2 ∧  b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨  b^{1, 819}_0 ∨  p_819 ∨ break
c  in DIMACS:
-3617 -3618  3619  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 819}_2 ∧ -b^{1, 819}_1 ∧ -b^{1, 819}_0 ∧ true) 
c  in CNF:
c    -b^{1, 819}_2 ∨  b^{1, 819}_1 ∨  b^{1, 819}_0 ∨ false 
c  in DIMACS:
-3617  3618  3619  0

c  3 does not represent an automaton state.
c    -(-b^{1, 819}_2 ∧  b^{1, 819}_1 ∧  b^{1, 819}_0 ∧ true) 
c  in CNF:
c     b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ false 
c  in DIMACS:
 3617 -3618 -3619  0
c  -3 does not represent an automaton state.
c    -( b^{1, 819}_2 ∧  b^{1, 819}_1 ∧  b^{1, 819}_0 ∧ true) 
c  in CNF:
c    -b^{1, 819}_2 ∨ -b^{1, 819}_1 ∨ -b^{1, 819}_0 ∨ false 
c  in DIMACS:
-3617 -3618 -3619  0

c i = 820
c  -2+1 --> -1
c    ( b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧  p_820) -> ( b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0)
c  in CNF:
c    -b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨  b^{1, 821}_2
c    -b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_1
c    -b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨  b^{1, 821}_0
c  in DIMACS:
-3620 -3621  3622 -820  3623 0
-3620 -3621  3622 -820 -3624 0
-3620 -3621  3622 -820  3625 0

c  -1+1 --> 0
c    ( b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0 ∧  p_820) -> (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧ -b^{1, 821}_0)
c  in CNF:
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_2
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_1
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_0
c  in DIMACS:
-3620  3621 -3622 -820 -3623 0
-3620  3621 -3622 -820 -3624 0
-3620  3621 -3622 -820 -3625 0

c  0+1 --> 1
c    (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧  p_820) -> (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0)
c  in CNF:
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_2
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_1
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨  b^{1, 821}_0
c  in DIMACS:
 3620  3621  3622 -820 -3623 0
 3620  3621  3622 -820 -3624 0
 3620  3621  3622 -820  3625 0

c  1+1 --> 2
c    (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0 ∧  p_820) -> (-b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0)
c  in CNF:
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_2
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨  b^{1, 821}_1
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ -p_820 ∨ -b^{1, 821}_0
c  in DIMACS:
 3620  3621 -3622 -820 -3623 0
 3620  3621 -3622 -820  3624 0
 3620  3621 -3622 -820 -3625 0

c  2+1 --> break 
c    (-b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧  p_820) -> break
c  in CNF:
c     b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 3620 -3621  3622 -820 1162 0


c  2-1 --> 1
c    (-b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧ -p_820) -> (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0)
c  in CNF:
c     b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_2
c     b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_1
c     b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨  b^{1, 821}_0
c  in DIMACS:
 3620 -3621  3622  820 -3623 0
 3620 -3621  3622  820 -3624 0
 3620 -3621  3622  820  3625 0

c  1-1 --> 0
c    (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0 ∧ -p_820) -> (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧ -b^{1, 821}_0)
c  in CNF:
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_2
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_1
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_0
c  in DIMACS:
 3620  3621 -3622  820 -3623 0
 3620  3621 -3622  820 -3624 0
 3620  3621 -3622  820 -3625 0

c  0-1 --> -1
c    (-b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧ -p_820) -> ( b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0)
c  in CNF:
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨  b^{1, 821}_2
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_1
c     b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨  b^{1, 821}_0
c  in DIMACS:
 3620  3621  3622  820  3623 0
 3620  3621  3622  820 -3624 0
 3620  3621  3622  820  3625 0

c  -1-1 --> -2
c    ( b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧  b^{1, 820}_0 ∧ -p_820) -> ( b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0)
c  in CNF:
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨  b^{1, 821}_2
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨  b^{1, 821}_1
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨  p_820 ∨ -b^{1, 821}_0
c  in DIMACS:
-3620  3621 -3622  820  3623 0
-3620  3621 -3622  820  3624 0
-3620  3621 -3622  820 -3625 0

c  -2-1 --> break 
c    ( b^{1, 820}_2 ∧  b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨  b^{1, 820}_0 ∨  p_820 ∨ break
c  in DIMACS:
-3620 -3621  3622  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 820}_2 ∧ -b^{1, 820}_1 ∧ -b^{1, 820}_0 ∧ true) 
c  in CNF:
c    -b^{1, 820}_2 ∨  b^{1, 820}_1 ∨  b^{1, 820}_0 ∨ false 
c  in DIMACS:
-3620  3621  3622  0

c  3 does not represent an automaton state.
c    -(-b^{1, 820}_2 ∧  b^{1, 820}_1 ∧  b^{1, 820}_0 ∧ true) 
c  in CNF:
c     b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ false 
c  in DIMACS:
 3620 -3621 -3622  0
c  -3 does not represent an automaton state.
c    -( b^{1, 820}_2 ∧  b^{1, 820}_1 ∧  b^{1, 820}_0 ∧ true) 
c  in CNF:
c    -b^{1, 820}_2 ∨ -b^{1, 820}_1 ∨ -b^{1, 820}_0 ∨ false 
c  in DIMACS:
-3620 -3621 -3622  0

c i = 821
c  -2+1 --> -1
c    ( b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧  p_821) -> ( b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0)
c  in CNF:
c    -b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨  b^{1, 822}_2
c    -b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_1
c    -b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨  b^{1, 822}_0
c  in DIMACS:
-3623 -3624  3625 -821  3626 0
-3623 -3624  3625 -821 -3627 0
-3623 -3624  3625 -821  3628 0

c  -1+1 --> 0
c    ( b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0 ∧  p_821) -> (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧ -b^{1, 822}_0)
c  in CNF:
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_2
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_1
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_0
c  in DIMACS:
-3623  3624 -3625 -821 -3626 0
-3623  3624 -3625 -821 -3627 0
-3623  3624 -3625 -821 -3628 0

c  0+1 --> 1
c    (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧  p_821) -> (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0)
c  in CNF:
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_2
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_1
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨  b^{1, 822}_0
c  in DIMACS:
 3623  3624  3625 -821 -3626 0
 3623  3624  3625 -821 -3627 0
 3623  3624  3625 -821  3628 0

c  1+1 --> 2
c    (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0 ∧  p_821) -> (-b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0)
c  in CNF:
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_2
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨  b^{1, 822}_1
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ -p_821 ∨ -b^{1, 822}_0
c  in DIMACS:
 3623  3624 -3625 -821 -3626 0
 3623  3624 -3625 -821  3627 0
 3623  3624 -3625 -821 -3628 0

c  2+1 --> break 
c    (-b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧  p_821) -> break
c  in CNF:
c     b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ -p_821 ∨ break
c  in DIMACS:
 3623 -3624  3625 -821 1162 0


c  2-1 --> 1
c    (-b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧ -p_821) -> (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0)
c  in CNF:
c     b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_2
c     b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_1
c     b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨  b^{1, 822}_0
c  in DIMACS:
 3623 -3624  3625  821 -3626 0
 3623 -3624  3625  821 -3627 0
 3623 -3624  3625  821  3628 0

c  1-1 --> 0
c    (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0 ∧ -p_821) -> (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧ -b^{1, 822}_0)
c  in CNF:
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_2
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_1
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_0
c  in DIMACS:
 3623  3624 -3625  821 -3626 0
 3623  3624 -3625  821 -3627 0
 3623  3624 -3625  821 -3628 0

c  0-1 --> -1
c    (-b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧ -p_821) -> ( b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0)
c  in CNF:
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨  b^{1, 822}_2
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_1
c     b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨  b^{1, 822}_0
c  in DIMACS:
 3623  3624  3625  821  3626 0
 3623  3624  3625  821 -3627 0
 3623  3624  3625  821  3628 0

c  -1-1 --> -2
c    ( b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧  b^{1, 821}_0 ∧ -p_821) -> ( b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0)
c  in CNF:
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨  b^{1, 822}_2
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨  b^{1, 822}_1
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨  p_821 ∨ -b^{1, 822}_0
c  in DIMACS:
-3623  3624 -3625  821  3626 0
-3623  3624 -3625  821  3627 0
-3623  3624 -3625  821 -3628 0

c  -2-1 --> break 
c    ( b^{1, 821}_2 ∧  b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧ -p_821) -> break
c  in CNF:
c    -b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨  b^{1, 821}_0 ∨  p_821 ∨ break
c  in DIMACS:
-3623 -3624  3625  821 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 821}_2 ∧ -b^{1, 821}_1 ∧ -b^{1, 821}_0 ∧ true) 
c  in CNF:
c    -b^{1, 821}_2 ∨  b^{1, 821}_1 ∨  b^{1, 821}_0 ∨ false 
c  in DIMACS:
-3623  3624  3625  0

c  3 does not represent an automaton state.
c    -(-b^{1, 821}_2 ∧  b^{1, 821}_1 ∧  b^{1, 821}_0 ∧ true) 
c  in CNF:
c     b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ false 
c  in DIMACS:
 3623 -3624 -3625  0
c  -3 does not represent an automaton state.
c    -( b^{1, 821}_2 ∧  b^{1, 821}_1 ∧  b^{1, 821}_0 ∧ true) 
c  in CNF:
c    -b^{1, 821}_2 ∨ -b^{1, 821}_1 ∨ -b^{1, 821}_0 ∨ false 
c  in DIMACS:
-3623 -3624 -3625  0

c i = 822
c  -2+1 --> -1
c    ( b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧  p_822) -> ( b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0)
c  in CNF:
c    -b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨  b^{1, 823}_2
c    -b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_1
c    -b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨  b^{1, 823}_0
c  in DIMACS:
-3626 -3627  3628 -822  3629 0
-3626 -3627  3628 -822 -3630 0
-3626 -3627  3628 -822  3631 0

c  -1+1 --> 0
c    ( b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0 ∧  p_822) -> (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧ -b^{1, 823}_0)
c  in CNF:
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_2
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_1
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_0
c  in DIMACS:
-3626  3627 -3628 -822 -3629 0
-3626  3627 -3628 -822 -3630 0
-3626  3627 -3628 -822 -3631 0

c  0+1 --> 1
c    (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧  p_822) -> (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0)
c  in CNF:
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_2
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_1
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨  b^{1, 823}_0
c  in DIMACS:
 3626  3627  3628 -822 -3629 0
 3626  3627  3628 -822 -3630 0
 3626  3627  3628 -822  3631 0

c  1+1 --> 2
c    (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0 ∧  p_822) -> (-b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0)
c  in CNF:
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_2
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨  b^{1, 823}_1
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ -p_822 ∨ -b^{1, 823}_0
c  in DIMACS:
 3626  3627 -3628 -822 -3629 0
 3626  3627 -3628 -822  3630 0
 3626  3627 -3628 -822 -3631 0

c  2+1 --> break 
c    (-b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧  p_822) -> break
c  in CNF:
c     b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 3626 -3627  3628 -822 1162 0


c  2-1 --> 1
c    (-b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧ -p_822) -> (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0)
c  in CNF:
c     b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_2
c     b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_1
c     b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨  b^{1, 823}_0
c  in DIMACS:
 3626 -3627  3628  822 -3629 0
 3626 -3627  3628  822 -3630 0
 3626 -3627  3628  822  3631 0

c  1-1 --> 0
c    (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0 ∧ -p_822) -> (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧ -b^{1, 823}_0)
c  in CNF:
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_2
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_1
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_0
c  in DIMACS:
 3626  3627 -3628  822 -3629 0
 3626  3627 -3628  822 -3630 0
 3626  3627 -3628  822 -3631 0

c  0-1 --> -1
c    (-b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧ -p_822) -> ( b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0)
c  in CNF:
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨  b^{1, 823}_2
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_1
c     b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨  b^{1, 823}_0
c  in DIMACS:
 3626  3627  3628  822  3629 0
 3626  3627  3628  822 -3630 0
 3626  3627  3628  822  3631 0

c  -1-1 --> -2
c    ( b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧  b^{1, 822}_0 ∧ -p_822) -> ( b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0)
c  in CNF:
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨  b^{1, 823}_2
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨  b^{1, 823}_1
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨  p_822 ∨ -b^{1, 823}_0
c  in DIMACS:
-3626  3627 -3628  822  3629 0
-3626  3627 -3628  822  3630 0
-3626  3627 -3628  822 -3631 0

c  -2-1 --> break 
c    ( b^{1, 822}_2 ∧  b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨  b^{1, 822}_0 ∨  p_822 ∨ break
c  in DIMACS:
-3626 -3627  3628  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 822}_2 ∧ -b^{1, 822}_1 ∧ -b^{1, 822}_0 ∧ true) 
c  in CNF:
c    -b^{1, 822}_2 ∨  b^{1, 822}_1 ∨  b^{1, 822}_0 ∨ false 
c  in DIMACS:
-3626  3627  3628  0

c  3 does not represent an automaton state.
c    -(-b^{1, 822}_2 ∧  b^{1, 822}_1 ∧  b^{1, 822}_0 ∧ true) 
c  in CNF:
c     b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ false 
c  in DIMACS:
 3626 -3627 -3628  0
c  -3 does not represent an automaton state.
c    -( b^{1, 822}_2 ∧  b^{1, 822}_1 ∧  b^{1, 822}_0 ∧ true) 
c  in CNF:
c    -b^{1, 822}_2 ∨ -b^{1, 822}_1 ∨ -b^{1, 822}_0 ∨ false 
c  in DIMACS:
-3626 -3627 -3628  0

c i = 823
c  -2+1 --> -1
c    ( b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧  p_823) -> ( b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0)
c  in CNF:
c    -b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨  b^{1, 824}_2
c    -b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_1
c    -b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨  b^{1, 824}_0
c  in DIMACS:
-3629 -3630  3631 -823  3632 0
-3629 -3630  3631 -823 -3633 0
-3629 -3630  3631 -823  3634 0

c  -1+1 --> 0
c    ( b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0 ∧  p_823) -> (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧ -b^{1, 824}_0)
c  in CNF:
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_2
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_1
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_0
c  in DIMACS:
-3629  3630 -3631 -823 -3632 0
-3629  3630 -3631 -823 -3633 0
-3629  3630 -3631 -823 -3634 0

c  0+1 --> 1
c    (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧  p_823) -> (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0)
c  in CNF:
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_2
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_1
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨  b^{1, 824}_0
c  in DIMACS:
 3629  3630  3631 -823 -3632 0
 3629  3630  3631 -823 -3633 0
 3629  3630  3631 -823  3634 0

c  1+1 --> 2
c    (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0 ∧  p_823) -> (-b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0)
c  in CNF:
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_2
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨  b^{1, 824}_1
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ -p_823 ∨ -b^{1, 824}_0
c  in DIMACS:
 3629  3630 -3631 -823 -3632 0
 3629  3630 -3631 -823  3633 0
 3629  3630 -3631 -823 -3634 0

c  2+1 --> break 
c    (-b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧  p_823) -> break
c  in CNF:
c     b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ -p_823 ∨ break
c  in DIMACS:
 3629 -3630  3631 -823 1162 0


c  2-1 --> 1
c    (-b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧ -p_823) -> (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0)
c  in CNF:
c     b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_2
c     b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_1
c     b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨  b^{1, 824}_0
c  in DIMACS:
 3629 -3630  3631  823 -3632 0
 3629 -3630  3631  823 -3633 0
 3629 -3630  3631  823  3634 0

c  1-1 --> 0
c    (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0 ∧ -p_823) -> (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧ -b^{1, 824}_0)
c  in CNF:
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_2
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_1
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_0
c  in DIMACS:
 3629  3630 -3631  823 -3632 0
 3629  3630 -3631  823 -3633 0
 3629  3630 -3631  823 -3634 0

c  0-1 --> -1
c    (-b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧ -p_823) -> ( b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0)
c  in CNF:
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨  b^{1, 824}_2
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_1
c     b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨  b^{1, 824}_0
c  in DIMACS:
 3629  3630  3631  823  3632 0
 3629  3630  3631  823 -3633 0
 3629  3630  3631  823  3634 0

c  -1-1 --> -2
c    ( b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧  b^{1, 823}_0 ∧ -p_823) -> ( b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0)
c  in CNF:
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨  b^{1, 824}_2
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨  b^{1, 824}_1
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨  p_823 ∨ -b^{1, 824}_0
c  in DIMACS:
-3629  3630 -3631  823  3632 0
-3629  3630 -3631  823  3633 0
-3629  3630 -3631  823 -3634 0

c  -2-1 --> break 
c    ( b^{1, 823}_2 ∧  b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧ -p_823) -> break
c  in CNF:
c    -b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨  b^{1, 823}_0 ∨  p_823 ∨ break
c  in DIMACS:
-3629 -3630  3631  823 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 823}_2 ∧ -b^{1, 823}_1 ∧ -b^{1, 823}_0 ∧ true) 
c  in CNF:
c    -b^{1, 823}_2 ∨  b^{1, 823}_1 ∨  b^{1, 823}_0 ∨ false 
c  in DIMACS:
-3629  3630  3631  0

c  3 does not represent an automaton state.
c    -(-b^{1, 823}_2 ∧  b^{1, 823}_1 ∧  b^{1, 823}_0 ∧ true) 
c  in CNF:
c     b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ false 
c  in DIMACS:
 3629 -3630 -3631  0
c  -3 does not represent an automaton state.
c    -( b^{1, 823}_2 ∧  b^{1, 823}_1 ∧  b^{1, 823}_0 ∧ true) 
c  in CNF:
c    -b^{1, 823}_2 ∨ -b^{1, 823}_1 ∨ -b^{1, 823}_0 ∨ false 
c  in DIMACS:
-3629 -3630 -3631  0

c i = 824
c  -2+1 --> -1
c    ( b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧  p_824) -> ( b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0)
c  in CNF:
c    -b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨  b^{1, 825}_2
c    -b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_1
c    -b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨  b^{1, 825}_0
c  in DIMACS:
-3632 -3633  3634 -824  3635 0
-3632 -3633  3634 -824 -3636 0
-3632 -3633  3634 -824  3637 0

c  -1+1 --> 0
c    ( b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0 ∧  p_824) -> (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧ -b^{1, 825}_0)
c  in CNF:
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_2
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_1
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_0
c  in DIMACS:
-3632  3633 -3634 -824 -3635 0
-3632  3633 -3634 -824 -3636 0
-3632  3633 -3634 -824 -3637 0

c  0+1 --> 1
c    (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧  p_824) -> (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0)
c  in CNF:
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_2
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_1
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨  b^{1, 825}_0
c  in DIMACS:
 3632  3633  3634 -824 -3635 0
 3632  3633  3634 -824 -3636 0
 3632  3633  3634 -824  3637 0

c  1+1 --> 2
c    (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0 ∧  p_824) -> (-b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0)
c  in CNF:
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_2
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨  b^{1, 825}_1
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ -p_824 ∨ -b^{1, 825}_0
c  in DIMACS:
 3632  3633 -3634 -824 -3635 0
 3632  3633 -3634 -824  3636 0
 3632  3633 -3634 -824 -3637 0

c  2+1 --> break 
c    (-b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧  p_824) -> break
c  in CNF:
c     b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 3632 -3633  3634 -824 1162 0


c  2-1 --> 1
c    (-b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧ -p_824) -> (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0)
c  in CNF:
c     b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_2
c     b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_1
c     b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨  b^{1, 825}_0
c  in DIMACS:
 3632 -3633  3634  824 -3635 0
 3632 -3633  3634  824 -3636 0
 3632 -3633  3634  824  3637 0

c  1-1 --> 0
c    (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0 ∧ -p_824) -> (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧ -b^{1, 825}_0)
c  in CNF:
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_2
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_1
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_0
c  in DIMACS:
 3632  3633 -3634  824 -3635 0
 3632  3633 -3634  824 -3636 0
 3632  3633 -3634  824 -3637 0

c  0-1 --> -1
c    (-b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧ -p_824) -> ( b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0)
c  in CNF:
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨  b^{1, 825}_2
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_1
c     b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨  b^{1, 825}_0
c  in DIMACS:
 3632  3633  3634  824  3635 0
 3632  3633  3634  824 -3636 0
 3632  3633  3634  824  3637 0

c  -1-1 --> -2
c    ( b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧  b^{1, 824}_0 ∧ -p_824) -> ( b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0)
c  in CNF:
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨  b^{1, 825}_2
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨  b^{1, 825}_1
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨  p_824 ∨ -b^{1, 825}_0
c  in DIMACS:
-3632  3633 -3634  824  3635 0
-3632  3633 -3634  824  3636 0
-3632  3633 -3634  824 -3637 0

c  -2-1 --> break 
c    ( b^{1, 824}_2 ∧  b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨  b^{1, 824}_0 ∨  p_824 ∨ break
c  in DIMACS:
-3632 -3633  3634  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 824}_2 ∧ -b^{1, 824}_1 ∧ -b^{1, 824}_0 ∧ true) 
c  in CNF:
c    -b^{1, 824}_2 ∨  b^{1, 824}_1 ∨  b^{1, 824}_0 ∨ false 
c  in DIMACS:
-3632  3633  3634  0

c  3 does not represent an automaton state.
c    -(-b^{1, 824}_2 ∧  b^{1, 824}_1 ∧  b^{1, 824}_0 ∧ true) 
c  in CNF:
c     b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ false 
c  in DIMACS:
 3632 -3633 -3634  0
c  -3 does not represent an automaton state.
c    -( b^{1, 824}_2 ∧  b^{1, 824}_1 ∧  b^{1, 824}_0 ∧ true) 
c  in CNF:
c    -b^{1, 824}_2 ∨ -b^{1, 824}_1 ∨ -b^{1, 824}_0 ∨ false 
c  in DIMACS:
-3632 -3633 -3634  0

c i = 825
c  -2+1 --> -1
c    ( b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧  p_825) -> ( b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0)
c  in CNF:
c    -b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨  b^{1, 826}_2
c    -b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_1
c    -b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨  b^{1, 826}_0
c  in DIMACS:
-3635 -3636  3637 -825  3638 0
-3635 -3636  3637 -825 -3639 0
-3635 -3636  3637 -825  3640 0

c  -1+1 --> 0
c    ( b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0 ∧  p_825) -> (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧ -b^{1, 826}_0)
c  in CNF:
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_2
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_1
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_0
c  in DIMACS:
-3635  3636 -3637 -825 -3638 0
-3635  3636 -3637 -825 -3639 0
-3635  3636 -3637 -825 -3640 0

c  0+1 --> 1
c    (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧  p_825) -> (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0)
c  in CNF:
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_2
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_1
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨  b^{1, 826}_0
c  in DIMACS:
 3635  3636  3637 -825 -3638 0
 3635  3636  3637 -825 -3639 0
 3635  3636  3637 -825  3640 0

c  1+1 --> 2
c    (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0 ∧  p_825) -> (-b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0)
c  in CNF:
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_2
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨  b^{1, 826}_1
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ -p_825 ∨ -b^{1, 826}_0
c  in DIMACS:
 3635  3636 -3637 -825 -3638 0
 3635  3636 -3637 -825  3639 0
 3635  3636 -3637 -825 -3640 0

c  2+1 --> break 
c    (-b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧  p_825) -> break
c  in CNF:
c     b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 3635 -3636  3637 -825 1162 0


c  2-1 --> 1
c    (-b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧ -p_825) -> (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0)
c  in CNF:
c     b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_2
c     b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_1
c     b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨  b^{1, 826}_0
c  in DIMACS:
 3635 -3636  3637  825 -3638 0
 3635 -3636  3637  825 -3639 0
 3635 -3636  3637  825  3640 0

c  1-1 --> 0
c    (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0 ∧ -p_825) -> (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧ -b^{1, 826}_0)
c  in CNF:
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_2
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_1
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_0
c  in DIMACS:
 3635  3636 -3637  825 -3638 0
 3635  3636 -3637  825 -3639 0
 3635  3636 -3637  825 -3640 0

c  0-1 --> -1
c    (-b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧ -p_825) -> ( b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0)
c  in CNF:
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨  b^{1, 826}_2
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_1
c     b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨  b^{1, 826}_0
c  in DIMACS:
 3635  3636  3637  825  3638 0
 3635  3636  3637  825 -3639 0
 3635  3636  3637  825  3640 0

c  -1-1 --> -2
c    ( b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧  b^{1, 825}_0 ∧ -p_825) -> ( b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0)
c  in CNF:
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨  b^{1, 826}_2
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨  b^{1, 826}_1
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨  p_825 ∨ -b^{1, 826}_0
c  in DIMACS:
-3635  3636 -3637  825  3638 0
-3635  3636 -3637  825  3639 0
-3635  3636 -3637  825 -3640 0

c  -2-1 --> break 
c    ( b^{1, 825}_2 ∧  b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨  b^{1, 825}_0 ∨  p_825 ∨ break
c  in DIMACS:
-3635 -3636  3637  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 825}_2 ∧ -b^{1, 825}_1 ∧ -b^{1, 825}_0 ∧ true) 
c  in CNF:
c    -b^{1, 825}_2 ∨  b^{1, 825}_1 ∨  b^{1, 825}_0 ∨ false 
c  in DIMACS:
-3635  3636  3637  0

c  3 does not represent an automaton state.
c    -(-b^{1, 825}_2 ∧  b^{1, 825}_1 ∧  b^{1, 825}_0 ∧ true) 
c  in CNF:
c     b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ false 
c  in DIMACS:
 3635 -3636 -3637  0
c  -3 does not represent an automaton state.
c    -( b^{1, 825}_2 ∧  b^{1, 825}_1 ∧  b^{1, 825}_0 ∧ true) 
c  in CNF:
c    -b^{1, 825}_2 ∨ -b^{1, 825}_1 ∨ -b^{1, 825}_0 ∨ false 
c  in DIMACS:
-3635 -3636 -3637  0

c i = 826
c  -2+1 --> -1
c    ( b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧  p_826) -> ( b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0)
c  in CNF:
c    -b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨  b^{1, 827}_2
c    -b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_1
c    -b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨  b^{1, 827}_0
c  in DIMACS:
-3638 -3639  3640 -826  3641 0
-3638 -3639  3640 -826 -3642 0
-3638 -3639  3640 -826  3643 0

c  -1+1 --> 0
c    ( b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0 ∧  p_826) -> (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧ -b^{1, 827}_0)
c  in CNF:
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_2
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_1
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_0
c  in DIMACS:
-3638  3639 -3640 -826 -3641 0
-3638  3639 -3640 -826 -3642 0
-3638  3639 -3640 -826 -3643 0

c  0+1 --> 1
c    (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧  p_826) -> (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0)
c  in CNF:
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_2
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_1
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨  b^{1, 827}_0
c  in DIMACS:
 3638  3639  3640 -826 -3641 0
 3638  3639  3640 -826 -3642 0
 3638  3639  3640 -826  3643 0

c  1+1 --> 2
c    (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0 ∧  p_826) -> (-b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0)
c  in CNF:
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_2
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨  b^{1, 827}_1
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ -p_826 ∨ -b^{1, 827}_0
c  in DIMACS:
 3638  3639 -3640 -826 -3641 0
 3638  3639 -3640 -826  3642 0
 3638  3639 -3640 -826 -3643 0

c  2+1 --> break 
c    (-b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧  p_826) -> break
c  in CNF:
c     b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 3638 -3639  3640 -826 1162 0


c  2-1 --> 1
c    (-b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧ -p_826) -> (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0)
c  in CNF:
c     b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_2
c     b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_1
c     b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨  b^{1, 827}_0
c  in DIMACS:
 3638 -3639  3640  826 -3641 0
 3638 -3639  3640  826 -3642 0
 3638 -3639  3640  826  3643 0

c  1-1 --> 0
c    (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0 ∧ -p_826) -> (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧ -b^{1, 827}_0)
c  in CNF:
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_2
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_1
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_0
c  in DIMACS:
 3638  3639 -3640  826 -3641 0
 3638  3639 -3640  826 -3642 0
 3638  3639 -3640  826 -3643 0

c  0-1 --> -1
c    (-b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧ -p_826) -> ( b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0)
c  in CNF:
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨  b^{1, 827}_2
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_1
c     b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨  b^{1, 827}_0
c  in DIMACS:
 3638  3639  3640  826  3641 0
 3638  3639  3640  826 -3642 0
 3638  3639  3640  826  3643 0

c  -1-1 --> -2
c    ( b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧  b^{1, 826}_0 ∧ -p_826) -> ( b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0)
c  in CNF:
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨  b^{1, 827}_2
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨  b^{1, 827}_1
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨  p_826 ∨ -b^{1, 827}_0
c  in DIMACS:
-3638  3639 -3640  826  3641 0
-3638  3639 -3640  826  3642 0
-3638  3639 -3640  826 -3643 0

c  -2-1 --> break 
c    ( b^{1, 826}_2 ∧  b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨  b^{1, 826}_0 ∨  p_826 ∨ break
c  in DIMACS:
-3638 -3639  3640  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 826}_2 ∧ -b^{1, 826}_1 ∧ -b^{1, 826}_0 ∧ true) 
c  in CNF:
c    -b^{1, 826}_2 ∨  b^{1, 826}_1 ∨  b^{1, 826}_0 ∨ false 
c  in DIMACS:
-3638  3639  3640  0

c  3 does not represent an automaton state.
c    -(-b^{1, 826}_2 ∧  b^{1, 826}_1 ∧  b^{1, 826}_0 ∧ true) 
c  in CNF:
c     b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ false 
c  in DIMACS:
 3638 -3639 -3640  0
c  -3 does not represent an automaton state.
c    -( b^{1, 826}_2 ∧  b^{1, 826}_1 ∧  b^{1, 826}_0 ∧ true) 
c  in CNF:
c    -b^{1, 826}_2 ∨ -b^{1, 826}_1 ∨ -b^{1, 826}_0 ∨ false 
c  in DIMACS:
-3638 -3639 -3640  0

c i = 827
c  -2+1 --> -1
c    ( b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧  p_827) -> ( b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0)
c  in CNF:
c    -b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨  b^{1, 828}_2
c    -b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_1
c    -b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨  b^{1, 828}_0
c  in DIMACS:
-3641 -3642  3643 -827  3644 0
-3641 -3642  3643 -827 -3645 0
-3641 -3642  3643 -827  3646 0

c  -1+1 --> 0
c    ( b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0 ∧  p_827) -> (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧ -b^{1, 828}_0)
c  in CNF:
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_2
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_1
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_0
c  in DIMACS:
-3641  3642 -3643 -827 -3644 0
-3641  3642 -3643 -827 -3645 0
-3641  3642 -3643 -827 -3646 0

c  0+1 --> 1
c    (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧  p_827) -> (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0)
c  in CNF:
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_2
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_1
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨  b^{1, 828}_0
c  in DIMACS:
 3641  3642  3643 -827 -3644 0
 3641  3642  3643 -827 -3645 0
 3641  3642  3643 -827  3646 0

c  1+1 --> 2
c    (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0 ∧  p_827) -> (-b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0)
c  in CNF:
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_2
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨  b^{1, 828}_1
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ -p_827 ∨ -b^{1, 828}_0
c  in DIMACS:
 3641  3642 -3643 -827 -3644 0
 3641  3642 -3643 -827  3645 0
 3641  3642 -3643 -827 -3646 0

c  2+1 --> break 
c    (-b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧  p_827) -> break
c  in CNF:
c     b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ -p_827 ∨ break
c  in DIMACS:
 3641 -3642  3643 -827 1162 0


c  2-1 --> 1
c    (-b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧ -p_827) -> (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0)
c  in CNF:
c     b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_2
c     b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_1
c     b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨  b^{1, 828}_0
c  in DIMACS:
 3641 -3642  3643  827 -3644 0
 3641 -3642  3643  827 -3645 0
 3641 -3642  3643  827  3646 0

c  1-1 --> 0
c    (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0 ∧ -p_827) -> (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧ -b^{1, 828}_0)
c  in CNF:
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_2
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_1
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_0
c  in DIMACS:
 3641  3642 -3643  827 -3644 0
 3641  3642 -3643  827 -3645 0
 3641  3642 -3643  827 -3646 0

c  0-1 --> -1
c    (-b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧ -p_827) -> ( b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0)
c  in CNF:
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨  b^{1, 828}_2
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_1
c     b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨  b^{1, 828}_0
c  in DIMACS:
 3641  3642  3643  827  3644 0
 3641  3642  3643  827 -3645 0
 3641  3642  3643  827  3646 0

c  -1-1 --> -2
c    ( b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧  b^{1, 827}_0 ∧ -p_827) -> ( b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0)
c  in CNF:
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨  b^{1, 828}_2
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨  b^{1, 828}_1
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨  p_827 ∨ -b^{1, 828}_0
c  in DIMACS:
-3641  3642 -3643  827  3644 0
-3641  3642 -3643  827  3645 0
-3641  3642 -3643  827 -3646 0

c  -2-1 --> break 
c    ( b^{1, 827}_2 ∧  b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧ -p_827) -> break
c  in CNF:
c    -b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨  b^{1, 827}_0 ∨  p_827 ∨ break
c  in DIMACS:
-3641 -3642  3643  827 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 827}_2 ∧ -b^{1, 827}_1 ∧ -b^{1, 827}_0 ∧ true) 
c  in CNF:
c    -b^{1, 827}_2 ∨  b^{1, 827}_1 ∨  b^{1, 827}_0 ∨ false 
c  in DIMACS:
-3641  3642  3643  0

c  3 does not represent an automaton state.
c    -(-b^{1, 827}_2 ∧  b^{1, 827}_1 ∧  b^{1, 827}_0 ∧ true) 
c  in CNF:
c     b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ false 
c  in DIMACS:
 3641 -3642 -3643  0
c  -3 does not represent an automaton state.
c    -( b^{1, 827}_2 ∧  b^{1, 827}_1 ∧  b^{1, 827}_0 ∧ true) 
c  in CNF:
c    -b^{1, 827}_2 ∨ -b^{1, 827}_1 ∨ -b^{1, 827}_0 ∨ false 
c  in DIMACS:
-3641 -3642 -3643  0

c i = 828
c  -2+1 --> -1
c    ( b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧  p_828) -> ( b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0)
c  in CNF:
c    -b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨  b^{1, 829}_2
c    -b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_1
c    -b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨  b^{1, 829}_0
c  in DIMACS:
-3644 -3645  3646 -828  3647 0
-3644 -3645  3646 -828 -3648 0
-3644 -3645  3646 -828  3649 0

c  -1+1 --> 0
c    ( b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0 ∧  p_828) -> (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧ -b^{1, 829}_0)
c  in CNF:
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_2
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_1
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_0
c  in DIMACS:
-3644  3645 -3646 -828 -3647 0
-3644  3645 -3646 -828 -3648 0
-3644  3645 -3646 -828 -3649 0

c  0+1 --> 1
c    (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧  p_828) -> (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0)
c  in CNF:
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_2
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_1
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨  b^{1, 829}_0
c  in DIMACS:
 3644  3645  3646 -828 -3647 0
 3644  3645  3646 -828 -3648 0
 3644  3645  3646 -828  3649 0

c  1+1 --> 2
c    (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0 ∧  p_828) -> (-b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0)
c  in CNF:
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_2
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨  b^{1, 829}_1
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ -p_828 ∨ -b^{1, 829}_0
c  in DIMACS:
 3644  3645 -3646 -828 -3647 0
 3644  3645 -3646 -828  3648 0
 3644  3645 -3646 -828 -3649 0

c  2+1 --> break 
c    (-b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧  p_828) -> break
c  in CNF:
c     b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 3644 -3645  3646 -828 1162 0


c  2-1 --> 1
c    (-b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧ -p_828) -> (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0)
c  in CNF:
c     b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_2
c     b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_1
c     b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨  b^{1, 829}_0
c  in DIMACS:
 3644 -3645  3646  828 -3647 0
 3644 -3645  3646  828 -3648 0
 3644 -3645  3646  828  3649 0

c  1-1 --> 0
c    (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0 ∧ -p_828) -> (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧ -b^{1, 829}_0)
c  in CNF:
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_2
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_1
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_0
c  in DIMACS:
 3644  3645 -3646  828 -3647 0
 3644  3645 -3646  828 -3648 0
 3644  3645 -3646  828 -3649 0

c  0-1 --> -1
c    (-b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧ -p_828) -> ( b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0)
c  in CNF:
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨  b^{1, 829}_2
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_1
c     b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨  b^{1, 829}_0
c  in DIMACS:
 3644  3645  3646  828  3647 0
 3644  3645  3646  828 -3648 0
 3644  3645  3646  828  3649 0

c  -1-1 --> -2
c    ( b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧  b^{1, 828}_0 ∧ -p_828) -> ( b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0)
c  in CNF:
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨  b^{1, 829}_2
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨  b^{1, 829}_1
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨  p_828 ∨ -b^{1, 829}_0
c  in DIMACS:
-3644  3645 -3646  828  3647 0
-3644  3645 -3646  828  3648 0
-3644  3645 -3646  828 -3649 0

c  -2-1 --> break 
c    ( b^{1, 828}_2 ∧  b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨  b^{1, 828}_0 ∨  p_828 ∨ break
c  in DIMACS:
-3644 -3645  3646  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 828}_2 ∧ -b^{1, 828}_1 ∧ -b^{1, 828}_0 ∧ true) 
c  in CNF:
c    -b^{1, 828}_2 ∨  b^{1, 828}_1 ∨  b^{1, 828}_0 ∨ false 
c  in DIMACS:
-3644  3645  3646  0

c  3 does not represent an automaton state.
c    -(-b^{1, 828}_2 ∧  b^{1, 828}_1 ∧  b^{1, 828}_0 ∧ true) 
c  in CNF:
c     b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ false 
c  in DIMACS:
 3644 -3645 -3646  0
c  -3 does not represent an automaton state.
c    -( b^{1, 828}_2 ∧  b^{1, 828}_1 ∧  b^{1, 828}_0 ∧ true) 
c  in CNF:
c    -b^{1, 828}_2 ∨ -b^{1, 828}_1 ∨ -b^{1, 828}_0 ∨ false 
c  in DIMACS:
-3644 -3645 -3646  0

c i = 829
c  -2+1 --> -1
c    ( b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧  p_829) -> ( b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0)
c  in CNF:
c    -b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨  b^{1, 830}_2
c    -b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_1
c    -b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨  b^{1, 830}_0
c  in DIMACS:
-3647 -3648  3649 -829  3650 0
-3647 -3648  3649 -829 -3651 0
-3647 -3648  3649 -829  3652 0

c  -1+1 --> 0
c    ( b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0 ∧  p_829) -> (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧ -b^{1, 830}_0)
c  in CNF:
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_2
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_1
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_0
c  in DIMACS:
-3647  3648 -3649 -829 -3650 0
-3647  3648 -3649 -829 -3651 0
-3647  3648 -3649 -829 -3652 0

c  0+1 --> 1
c    (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧  p_829) -> (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0)
c  in CNF:
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_2
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_1
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨  b^{1, 830}_0
c  in DIMACS:
 3647  3648  3649 -829 -3650 0
 3647  3648  3649 -829 -3651 0
 3647  3648  3649 -829  3652 0

c  1+1 --> 2
c    (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0 ∧  p_829) -> (-b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0)
c  in CNF:
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_2
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨  b^{1, 830}_1
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ -p_829 ∨ -b^{1, 830}_0
c  in DIMACS:
 3647  3648 -3649 -829 -3650 0
 3647  3648 -3649 -829  3651 0
 3647  3648 -3649 -829 -3652 0

c  2+1 --> break 
c    (-b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧  p_829) -> break
c  in CNF:
c     b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ -p_829 ∨ break
c  in DIMACS:
 3647 -3648  3649 -829 1162 0


c  2-1 --> 1
c    (-b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧ -p_829) -> (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0)
c  in CNF:
c     b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_2
c     b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_1
c     b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨  b^{1, 830}_0
c  in DIMACS:
 3647 -3648  3649  829 -3650 0
 3647 -3648  3649  829 -3651 0
 3647 -3648  3649  829  3652 0

c  1-1 --> 0
c    (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0 ∧ -p_829) -> (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧ -b^{1, 830}_0)
c  in CNF:
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_2
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_1
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_0
c  in DIMACS:
 3647  3648 -3649  829 -3650 0
 3647  3648 -3649  829 -3651 0
 3647  3648 -3649  829 -3652 0

c  0-1 --> -1
c    (-b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧ -p_829) -> ( b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0)
c  in CNF:
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨  b^{1, 830}_2
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_1
c     b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨  b^{1, 830}_0
c  in DIMACS:
 3647  3648  3649  829  3650 0
 3647  3648  3649  829 -3651 0
 3647  3648  3649  829  3652 0

c  -1-1 --> -2
c    ( b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧  b^{1, 829}_0 ∧ -p_829) -> ( b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0)
c  in CNF:
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨  b^{1, 830}_2
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨  b^{1, 830}_1
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨  p_829 ∨ -b^{1, 830}_0
c  in DIMACS:
-3647  3648 -3649  829  3650 0
-3647  3648 -3649  829  3651 0
-3647  3648 -3649  829 -3652 0

c  -2-1 --> break 
c    ( b^{1, 829}_2 ∧  b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧ -p_829) -> break
c  in CNF:
c    -b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨  b^{1, 829}_0 ∨  p_829 ∨ break
c  in DIMACS:
-3647 -3648  3649  829 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 829}_2 ∧ -b^{1, 829}_1 ∧ -b^{1, 829}_0 ∧ true) 
c  in CNF:
c    -b^{1, 829}_2 ∨  b^{1, 829}_1 ∨  b^{1, 829}_0 ∨ false 
c  in DIMACS:
-3647  3648  3649  0

c  3 does not represent an automaton state.
c    -(-b^{1, 829}_2 ∧  b^{1, 829}_1 ∧  b^{1, 829}_0 ∧ true) 
c  in CNF:
c     b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ false 
c  in DIMACS:
 3647 -3648 -3649  0
c  -3 does not represent an automaton state.
c    -( b^{1, 829}_2 ∧  b^{1, 829}_1 ∧  b^{1, 829}_0 ∧ true) 
c  in CNF:
c    -b^{1, 829}_2 ∨ -b^{1, 829}_1 ∨ -b^{1, 829}_0 ∨ false 
c  in DIMACS:
-3647 -3648 -3649  0

c i = 830
c  -2+1 --> -1
c    ( b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧  p_830) -> ( b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0)
c  in CNF:
c    -b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨  b^{1, 831}_2
c    -b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_1
c    -b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨  b^{1, 831}_0
c  in DIMACS:
-3650 -3651  3652 -830  3653 0
-3650 -3651  3652 -830 -3654 0
-3650 -3651  3652 -830  3655 0

c  -1+1 --> 0
c    ( b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0 ∧  p_830) -> (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧ -b^{1, 831}_0)
c  in CNF:
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_2
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_1
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_0
c  in DIMACS:
-3650  3651 -3652 -830 -3653 0
-3650  3651 -3652 -830 -3654 0
-3650  3651 -3652 -830 -3655 0

c  0+1 --> 1
c    (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧  p_830) -> (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0)
c  in CNF:
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_2
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_1
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨  b^{1, 831}_0
c  in DIMACS:
 3650  3651  3652 -830 -3653 0
 3650  3651  3652 -830 -3654 0
 3650  3651  3652 -830  3655 0

c  1+1 --> 2
c    (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0 ∧  p_830) -> (-b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0)
c  in CNF:
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_2
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨  b^{1, 831}_1
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ -p_830 ∨ -b^{1, 831}_0
c  in DIMACS:
 3650  3651 -3652 -830 -3653 0
 3650  3651 -3652 -830  3654 0
 3650  3651 -3652 -830 -3655 0

c  2+1 --> break 
c    (-b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧  p_830) -> break
c  in CNF:
c     b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 3650 -3651  3652 -830 1162 0


c  2-1 --> 1
c    (-b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧ -p_830) -> (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0)
c  in CNF:
c     b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_2
c     b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_1
c     b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨  b^{1, 831}_0
c  in DIMACS:
 3650 -3651  3652  830 -3653 0
 3650 -3651  3652  830 -3654 0
 3650 -3651  3652  830  3655 0

c  1-1 --> 0
c    (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0 ∧ -p_830) -> (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧ -b^{1, 831}_0)
c  in CNF:
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_2
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_1
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_0
c  in DIMACS:
 3650  3651 -3652  830 -3653 0
 3650  3651 -3652  830 -3654 0
 3650  3651 -3652  830 -3655 0

c  0-1 --> -1
c    (-b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧ -p_830) -> ( b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0)
c  in CNF:
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨  b^{1, 831}_2
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_1
c     b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨  b^{1, 831}_0
c  in DIMACS:
 3650  3651  3652  830  3653 0
 3650  3651  3652  830 -3654 0
 3650  3651  3652  830  3655 0

c  -1-1 --> -2
c    ( b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧  b^{1, 830}_0 ∧ -p_830) -> ( b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0)
c  in CNF:
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨  b^{1, 831}_2
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨  b^{1, 831}_1
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨  p_830 ∨ -b^{1, 831}_0
c  in DIMACS:
-3650  3651 -3652  830  3653 0
-3650  3651 -3652  830  3654 0
-3650  3651 -3652  830 -3655 0

c  -2-1 --> break 
c    ( b^{1, 830}_2 ∧  b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨  b^{1, 830}_0 ∨  p_830 ∨ break
c  in DIMACS:
-3650 -3651  3652  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 830}_2 ∧ -b^{1, 830}_1 ∧ -b^{1, 830}_0 ∧ true) 
c  in CNF:
c    -b^{1, 830}_2 ∨  b^{1, 830}_1 ∨  b^{1, 830}_0 ∨ false 
c  in DIMACS:
-3650  3651  3652  0

c  3 does not represent an automaton state.
c    -(-b^{1, 830}_2 ∧  b^{1, 830}_1 ∧  b^{1, 830}_0 ∧ true) 
c  in CNF:
c     b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ false 
c  in DIMACS:
 3650 -3651 -3652  0
c  -3 does not represent an automaton state.
c    -( b^{1, 830}_2 ∧  b^{1, 830}_1 ∧  b^{1, 830}_0 ∧ true) 
c  in CNF:
c    -b^{1, 830}_2 ∨ -b^{1, 830}_1 ∨ -b^{1, 830}_0 ∨ false 
c  in DIMACS:
-3650 -3651 -3652  0

c i = 831
c  -2+1 --> -1
c    ( b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧  p_831) -> ( b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0)
c  in CNF:
c    -b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨  b^{1, 832}_2
c    -b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_1
c    -b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨  b^{1, 832}_0
c  in DIMACS:
-3653 -3654  3655 -831  3656 0
-3653 -3654  3655 -831 -3657 0
-3653 -3654  3655 -831  3658 0

c  -1+1 --> 0
c    ( b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0 ∧  p_831) -> (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧ -b^{1, 832}_0)
c  in CNF:
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_2
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_1
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_0
c  in DIMACS:
-3653  3654 -3655 -831 -3656 0
-3653  3654 -3655 -831 -3657 0
-3653  3654 -3655 -831 -3658 0

c  0+1 --> 1
c    (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧  p_831) -> (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0)
c  in CNF:
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_2
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_1
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨  b^{1, 832}_0
c  in DIMACS:
 3653  3654  3655 -831 -3656 0
 3653  3654  3655 -831 -3657 0
 3653  3654  3655 -831  3658 0

c  1+1 --> 2
c    (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0 ∧  p_831) -> (-b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0)
c  in CNF:
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_2
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨  b^{1, 832}_1
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ -p_831 ∨ -b^{1, 832}_0
c  in DIMACS:
 3653  3654 -3655 -831 -3656 0
 3653  3654 -3655 -831  3657 0
 3653  3654 -3655 -831 -3658 0

c  2+1 --> break 
c    (-b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧  p_831) -> break
c  in CNF:
c     b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ -p_831 ∨ break
c  in DIMACS:
 3653 -3654  3655 -831 1162 0


c  2-1 --> 1
c    (-b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧ -p_831) -> (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0)
c  in CNF:
c     b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_2
c     b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_1
c     b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨  b^{1, 832}_0
c  in DIMACS:
 3653 -3654  3655  831 -3656 0
 3653 -3654  3655  831 -3657 0
 3653 -3654  3655  831  3658 0

c  1-1 --> 0
c    (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0 ∧ -p_831) -> (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧ -b^{1, 832}_0)
c  in CNF:
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_2
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_1
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_0
c  in DIMACS:
 3653  3654 -3655  831 -3656 0
 3653  3654 -3655  831 -3657 0
 3653  3654 -3655  831 -3658 0

c  0-1 --> -1
c    (-b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧ -p_831) -> ( b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0)
c  in CNF:
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨  b^{1, 832}_2
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_1
c     b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨  b^{1, 832}_0
c  in DIMACS:
 3653  3654  3655  831  3656 0
 3653  3654  3655  831 -3657 0
 3653  3654  3655  831  3658 0

c  -1-1 --> -2
c    ( b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧  b^{1, 831}_0 ∧ -p_831) -> ( b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0)
c  in CNF:
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨  b^{1, 832}_2
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨  b^{1, 832}_1
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨  p_831 ∨ -b^{1, 832}_0
c  in DIMACS:
-3653  3654 -3655  831  3656 0
-3653  3654 -3655  831  3657 0
-3653  3654 -3655  831 -3658 0

c  -2-1 --> break 
c    ( b^{1, 831}_2 ∧  b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧ -p_831) -> break
c  in CNF:
c    -b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨  b^{1, 831}_0 ∨  p_831 ∨ break
c  in DIMACS:
-3653 -3654  3655  831 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 831}_2 ∧ -b^{1, 831}_1 ∧ -b^{1, 831}_0 ∧ true) 
c  in CNF:
c    -b^{1, 831}_2 ∨  b^{1, 831}_1 ∨  b^{1, 831}_0 ∨ false 
c  in DIMACS:
-3653  3654  3655  0

c  3 does not represent an automaton state.
c    -(-b^{1, 831}_2 ∧  b^{1, 831}_1 ∧  b^{1, 831}_0 ∧ true) 
c  in CNF:
c     b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ false 
c  in DIMACS:
 3653 -3654 -3655  0
c  -3 does not represent an automaton state.
c    -( b^{1, 831}_2 ∧  b^{1, 831}_1 ∧  b^{1, 831}_0 ∧ true) 
c  in CNF:
c    -b^{1, 831}_2 ∨ -b^{1, 831}_1 ∨ -b^{1, 831}_0 ∨ false 
c  in DIMACS:
-3653 -3654 -3655  0

c i = 832
c  -2+1 --> -1
c    ( b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧  p_832) -> ( b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0)
c  in CNF:
c    -b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨  b^{1, 833}_2
c    -b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_1
c    -b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨  b^{1, 833}_0
c  in DIMACS:
-3656 -3657  3658 -832  3659 0
-3656 -3657  3658 -832 -3660 0
-3656 -3657  3658 -832  3661 0

c  -1+1 --> 0
c    ( b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0 ∧  p_832) -> (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧ -b^{1, 833}_0)
c  in CNF:
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_2
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_1
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_0
c  in DIMACS:
-3656  3657 -3658 -832 -3659 0
-3656  3657 -3658 -832 -3660 0
-3656  3657 -3658 -832 -3661 0

c  0+1 --> 1
c    (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧  p_832) -> (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0)
c  in CNF:
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_2
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_1
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨  b^{1, 833}_0
c  in DIMACS:
 3656  3657  3658 -832 -3659 0
 3656  3657  3658 -832 -3660 0
 3656  3657  3658 -832  3661 0

c  1+1 --> 2
c    (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0 ∧  p_832) -> (-b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0)
c  in CNF:
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_2
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨  b^{1, 833}_1
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ -p_832 ∨ -b^{1, 833}_0
c  in DIMACS:
 3656  3657 -3658 -832 -3659 0
 3656  3657 -3658 -832  3660 0
 3656  3657 -3658 -832 -3661 0

c  2+1 --> break 
c    (-b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧  p_832) -> break
c  in CNF:
c     b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 3656 -3657  3658 -832 1162 0


c  2-1 --> 1
c    (-b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧ -p_832) -> (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0)
c  in CNF:
c     b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_2
c     b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_1
c     b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨  b^{1, 833}_0
c  in DIMACS:
 3656 -3657  3658  832 -3659 0
 3656 -3657  3658  832 -3660 0
 3656 -3657  3658  832  3661 0

c  1-1 --> 0
c    (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0 ∧ -p_832) -> (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧ -b^{1, 833}_0)
c  in CNF:
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_2
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_1
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_0
c  in DIMACS:
 3656  3657 -3658  832 -3659 0
 3656  3657 -3658  832 -3660 0
 3656  3657 -3658  832 -3661 0

c  0-1 --> -1
c    (-b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧ -p_832) -> ( b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0)
c  in CNF:
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨  b^{1, 833}_2
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_1
c     b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨  b^{1, 833}_0
c  in DIMACS:
 3656  3657  3658  832  3659 0
 3656  3657  3658  832 -3660 0
 3656  3657  3658  832  3661 0

c  -1-1 --> -2
c    ( b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧  b^{1, 832}_0 ∧ -p_832) -> ( b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0)
c  in CNF:
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨  b^{1, 833}_2
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨  b^{1, 833}_1
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨  p_832 ∨ -b^{1, 833}_0
c  in DIMACS:
-3656  3657 -3658  832  3659 0
-3656  3657 -3658  832  3660 0
-3656  3657 -3658  832 -3661 0

c  -2-1 --> break 
c    ( b^{1, 832}_2 ∧  b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨  b^{1, 832}_0 ∨  p_832 ∨ break
c  in DIMACS:
-3656 -3657  3658  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 832}_2 ∧ -b^{1, 832}_1 ∧ -b^{1, 832}_0 ∧ true) 
c  in CNF:
c    -b^{1, 832}_2 ∨  b^{1, 832}_1 ∨  b^{1, 832}_0 ∨ false 
c  in DIMACS:
-3656  3657  3658  0

c  3 does not represent an automaton state.
c    -(-b^{1, 832}_2 ∧  b^{1, 832}_1 ∧  b^{1, 832}_0 ∧ true) 
c  in CNF:
c     b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ false 
c  in DIMACS:
 3656 -3657 -3658  0
c  -3 does not represent an automaton state.
c    -( b^{1, 832}_2 ∧  b^{1, 832}_1 ∧  b^{1, 832}_0 ∧ true) 
c  in CNF:
c    -b^{1, 832}_2 ∨ -b^{1, 832}_1 ∨ -b^{1, 832}_0 ∨ false 
c  in DIMACS:
-3656 -3657 -3658  0

c i = 833
c  -2+1 --> -1
c    ( b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧  p_833) -> ( b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0)
c  in CNF:
c    -b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨  b^{1, 834}_2
c    -b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_1
c    -b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨  b^{1, 834}_0
c  in DIMACS:
-3659 -3660  3661 -833  3662 0
-3659 -3660  3661 -833 -3663 0
-3659 -3660  3661 -833  3664 0

c  -1+1 --> 0
c    ( b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0 ∧  p_833) -> (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧ -b^{1, 834}_0)
c  in CNF:
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_2
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_1
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_0
c  in DIMACS:
-3659  3660 -3661 -833 -3662 0
-3659  3660 -3661 -833 -3663 0
-3659  3660 -3661 -833 -3664 0

c  0+1 --> 1
c    (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧  p_833) -> (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0)
c  in CNF:
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_2
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_1
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨  b^{1, 834}_0
c  in DIMACS:
 3659  3660  3661 -833 -3662 0
 3659  3660  3661 -833 -3663 0
 3659  3660  3661 -833  3664 0

c  1+1 --> 2
c    (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0 ∧  p_833) -> (-b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0)
c  in CNF:
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_2
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨  b^{1, 834}_1
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ -p_833 ∨ -b^{1, 834}_0
c  in DIMACS:
 3659  3660 -3661 -833 -3662 0
 3659  3660 -3661 -833  3663 0
 3659  3660 -3661 -833 -3664 0

c  2+1 --> break 
c    (-b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧  p_833) -> break
c  in CNF:
c     b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ -p_833 ∨ break
c  in DIMACS:
 3659 -3660  3661 -833 1162 0


c  2-1 --> 1
c    (-b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧ -p_833) -> (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0)
c  in CNF:
c     b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_2
c     b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_1
c     b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨  b^{1, 834}_0
c  in DIMACS:
 3659 -3660  3661  833 -3662 0
 3659 -3660  3661  833 -3663 0
 3659 -3660  3661  833  3664 0

c  1-1 --> 0
c    (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0 ∧ -p_833) -> (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧ -b^{1, 834}_0)
c  in CNF:
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_2
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_1
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_0
c  in DIMACS:
 3659  3660 -3661  833 -3662 0
 3659  3660 -3661  833 -3663 0
 3659  3660 -3661  833 -3664 0

c  0-1 --> -1
c    (-b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧ -p_833) -> ( b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0)
c  in CNF:
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨  b^{1, 834}_2
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_1
c     b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨  b^{1, 834}_0
c  in DIMACS:
 3659  3660  3661  833  3662 0
 3659  3660  3661  833 -3663 0
 3659  3660  3661  833  3664 0

c  -1-1 --> -2
c    ( b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧  b^{1, 833}_0 ∧ -p_833) -> ( b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0)
c  in CNF:
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨  b^{1, 834}_2
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨  b^{1, 834}_1
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨  p_833 ∨ -b^{1, 834}_0
c  in DIMACS:
-3659  3660 -3661  833  3662 0
-3659  3660 -3661  833  3663 0
-3659  3660 -3661  833 -3664 0

c  -2-1 --> break 
c    ( b^{1, 833}_2 ∧  b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧ -p_833) -> break
c  in CNF:
c    -b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨  b^{1, 833}_0 ∨  p_833 ∨ break
c  in DIMACS:
-3659 -3660  3661  833 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 833}_2 ∧ -b^{1, 833}_1 ∧ -b^{1, 833}_0 ∧ true) 
c  in CNF:
c    -b^{1, 833}_2 ∨  b^{1, 833}_1 ∨  b^{1, 833}_0 ∨ false 
c  in DIMACS:
-3659  3660  3661  0

c  3 does not represent an automaton state.
c    -(-b^{1, 833}_2 ∧  b^{1, 833}_1 ∧  b^{1, 833}_0 ∧ true) 
c  in CNF:
c     b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ false 
c  in DIMACS:
 3659 -3660 -3661  0
c  -3 does not represent an automaton state.
c    -( b^{1, 833}_2 ∧  b^{1, 833}_1 ∧  b^{1, 833}_0 ∧ true) 
c  in CNF:
c    -b^{1, 833}_2 ∨ -b^{1, 833}_1 ∨ -b^{1, 833}_0 ∨ false 
c  in DIMACS:
-3659 -3660 -3661  0

c i = 834
c  -2+1 --> -1
c    ( b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧  p_834) -> ( b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0)
c  in CNF:
c    -b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨  b^{1, 835}_2
c    -b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_1
c    -b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨  b^{1, 835}_0
c  in DIMACS:
-3662 -3663  3664 -834  3665 0
-3662 -3663  3664 -834 -3666 0
-3662 -3663  3664 -834  3667 0

c  -1+1 --> 0
c    ( b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0 ∧  p_834) -> (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧ -b^{1, 835}_0)
c  in CNF:
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_2
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_1
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_0
c  in DIMACS:
-3662  3663 -3664 -834 -3665 0
-3662  3663 -3664 -834 -3666 0
-3662  3663 -3664 -834 -3667 0

c  0+1 --> 1
c    (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧  p_834) -> (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0)
c  in CNF:
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_2
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_1
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨  b^{1, 835}_0
c  in DIMACS:
 3662  3663  3664 -834 -3665 0
 3662  3663  3664 -834 -3666 0
 3662  3663  3664 -834  3667 0

c  1+1 --> 2
c    (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0 ∧  p_834) -> (-b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0)
c  in CNF:
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_2
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨  b^{1, 835}_1
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ -p_834 ∨ -b^{1, 835}_0
c  in DIMACS:
 3662  3663 -3664 -834 -3665 0
 3662  3663 -3664 -834  3666 0
 3662  3663 -3664 -834 -3667 0

c  2+1 --> break 
c    (-b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧  p_834) -> break
c  in CNF:
c     b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 3662 -3663  3664 -834 1162 0


c  2-1 --> 1
c    (-b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧ -p_834) -> (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0)
c  in CNF:
c     b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_2
c     b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_1
c     b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨  b^{1, 835}_0
c  in DIMACS:
 3662 -3663  3664  834 -3665 0
 3662 -3663  3664  834 -3666 0
 3662 -3663  3664  834  3667 0

c  1-1 --> 0
c    (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0 ∧ -p_834) -> (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧ -b^{1, 835}_0)
c  in CNF:
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_2
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_1
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_0
c  in DIMACS:
 3662  3663 -3664  834 -3665 0
 3662  3663 -3664  834 -3666 0
 3662  3663 -3664  834 -3667 0

c  0-1 --> -1
c    (-b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧ -p_834) -> ( b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0)
c  in CNF:
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨  b^{1, 835}_2
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_1
c     b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨  b^{1, 835}_0
c  in DIMACS:
 3662  3663  3664  834  3665 0
 3662  3663  3664  834 -3666 0
 3662  3663  3664  834  3667 0

c  -1-1 --> -2
c    ( b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧  b^{1, 834}_0 ∧ -p_834) -> ( b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0)
c  in CNF:
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨  b^{1, 835}_2
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨  b^{1, 835}_1
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨  p_834 ∨ -b^{1, 835}_0
c  in DIMACS:
-3662  3663 -3664  834  3665 0
-3662  3663 -3664  834  3666 0
-3662  3663 -3664  834 -3667 0

c  -2-1 --> break 
c    ( b^{1, 834}_2 ∧  b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨  b^{1, 834}_0 ∨  p_834 ∨ break
c  in DIMACS:
-3662 -3663  3664  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 834}_2 ∧ -b^{1, 834}_1 ∧ -b^{1, 834}_0 ∧ true) 
c  in CNF:
c    -b^{1, 834}_2 ∨  b^{1, 834}_1 ∨  b^{1, 834}_0 ∨ false 
c  in DIMACS:
-3662  3663  3664  0

c  3 does not represent an automaton state.
c    -(-b^{1, 834}_2 ∧  b^{1, 834}_1 ∧  b^{1, 834}_0 ∧ true) 
c  in CNF:
c     b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ false 
c  in DIMACS:
 3662 -3663 -3664  0
c  -3 does not represent an automaton state.
c    -( b^{1, 834}_2 ∧  b^{1, 834}_1 ∧  b^{1, 834}_0 ∧ true) 
c  in CNF:
c    -b^{1, 834}_2 ∨ -b^{1, 834}_1 ∨ -b^{1, 834}_0 ∨ false 
c  in DIMACS:
-3662 -3663 -3664  0

c i = 835
c  -2+1 --> -1
c    ( b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧  p_835) -> ( b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0)
c  in CNF:
c    -b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨  b^{1, 836}_2
c    -b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_1
c    -b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨  b^{1, 836}_0
c  in DIMACS:
-3665 -3666  3667 -835  3668 0
-3665 -3666  3667 -835 -3669 0
-3665 -3666  3667 -835  3670 0

c  -1+1 --> 0
c    ( b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0 ∧  p_835) -> (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧ -b^{1, 836}_0)
c  in CNF:
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_2
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_1
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_0
c  in DIMACS:
-3665  3666 -3667 -835 -3668 0
-3665  3666 -3667 -835 -3669 0
-3665  3666 -3667 -835 -3670 0

c  0+1 --> 1
c    (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧  p_835) -> (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0)
c  in CNF:
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_2
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_1
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨  b^{1, 836}_0
c  in DIMACS:
 3665  3666  3667 -835 -3668 0
 3665  3666  3667 -835 -3669 0
 3665  3666  3667 -835  3670 0

c  1+1 --> 2
c    (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0 ∧  p_835) -> (-b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0)
c  in CNF:
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_2
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨  b^{1, 836}_1
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ -p_835 ∨ -b^{1, 836}_0
c  in DIMACS:
 3665  3666 -3667 -835 -3668 0
 3665  3666 -3667 -835  3669 0
 3665  3666 -3667 -835 -3670 0

c  2+1 --> break 
c    (-b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧  p_835) -> break
c  in CNF:
c     b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ -p_835 ∨ break
c  in DIMACS:
 3665 -3666  3667 -835 1162 0


c  2-1 --> 1
c    (-b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧ -p_835) -> (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0)
c  in CNF:
c     b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_2
c     b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_1
c     b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨  b^{1, 836}_0
c  in DIMACS:
 3665 -3666  3667  835 -3668 0
 3665 -3666  3667  835 -3669 0
 3665 -3666  3667  835  3670 0

c  1-1 --> 0
c    (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0 ∧ -p_835) -> (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧ -b^{1, 836}_0)
c  in CNF:
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_2
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_1
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_0
c  in DIMACS:
 3665  3666 -3667  835 -3668 0
 3665  3666 -3667  835 -3669 0
 3665  3666 -3667  835 -3670 0

c  0-1 --> -1
c    (-b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧ -p_835) -> ( b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0)
c  in CNF:
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨  b^{1, 836}_2
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_1
c     b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨  b^{1, 836}_0
c  in DIMACS:
 3665  3666  3667  835  3668 0
 3665  3666  3667  835 -3669 0
 3665  3666  3667  835  3670 0

c  -1-1 --> -2
c    ( b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧  b^{1, 835}_0 ∧ -p_835) -> ( b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0)
c  in CNF:
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨  b^{1, 836}_2
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨  b^{1, 836}_1
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨  p_835 ∨ -b^{1, 836}_0
c  in DIMACS:
-3665  3666 -3667  835  3668 0
-3665  3666 -3667  835  3669 0
-3665  3666 -3667  835 -3670 0

c  -2-1 --> break 
c    ( b^{1, 835}_2 ∧  b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧ -p_835) -> break
c  in CNF:
c    -b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨  b^{1, 835}_0 ∨  p_835 ∨ break
c  in DIMACS:
-3665 -3666  3667  835 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 835}_2 ∧ -b^{1, 835}_1 ∧ -b^{1, 835}_0 ∧ true) 
c  in CNF:
c    -b^{1, 835}_2 ∨  b^{1, 835}_1 ∨  b^{1, 835}_0 ∨ false 
c  in DIMACS:
-3665  3666  3667  0

c  3 does not represent an automaton state.
c    -(-b^{1, 835}_2 ∧  b^{1, 835}_1 ∧  b^{1, 835}_0 ∧ true) 
c  in CNF:
c     b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ false 
c  in DIMACS:
 3665 -3666 -3667  0
c  -3 does not represent an automaton state.
c    -( b^{1, 835}_2 ∧  b^{1, 835}_1 ∧  b^{1, 835}_0 ∧ true) 
c  in CNF:
c    -b^{1, 835}_2 ∨ -b^{1, 835}_1 ∨ -b^{1, 835}_0 ∨ false 
c  in DIMACS:
-3665 -3666 -3667  0

c i = 836
c  -2+1 --> -1
c    ( b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧  p_836) -> ( b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0)
c  in CNF:
c    -b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨  b^{1, 837}_2
c    -b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_1
c    -b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨  b^{1, 837}_0
c  in DIMACS:
-3668 -3669  3670 -836  3671 0
-3668 -3669  3670 -836 -3672 0
-3668 -3669  3670 -836  3673 0

c  -1+1 --> 0
c    ( b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0 ∧  p_836) -> (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧ -b^{1, 837}_0)
c  in CNF:
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_2
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_1
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_0
c  in DIMACS:
-3668  3669 -3670 -836 -3671 0
-3668  3669 -3670 -836 -3672 0
-3668  3669 -3670 -836 -3673 0

c  0+1 --> 1
c    (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧  p_836) -> (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0)
c  in CNF:
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_2
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_1
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨  b^{1, 837}_0
c  in DIMACS:
 3668  3669  3670 -836 -3671 0
 3668  3669  3670 -836 -3672 0
 3668  3669  3670 -836  3673 0

c  1+1 --> 2
c    (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0 ∧  p_836) -> (-b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0)
c  in CNF:
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_2
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨  b^{1, 837}_1
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ -p_836 ∨ -b^{1, 837}_0
c  in DIMACS:
 3668  3669 -3670 -836 -3671 0
 3668  3669 -3670 -836  3672 0
 3668  3669 -3670 -836 -3673 0

c  2+1 --> break 
c    (-b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧  p_836) -> break
c  in CNF:
c     b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 3668 -3669  3670 -836 1162 0


c  2-1 --> 1
c    (-b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧ -p_836) -> (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0)
c  in CNF:
c     b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_2
c     b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_1
c     b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨  b^{1, 837}_0
c  in DIMACS:
 3668 -3669  3670  836 -3671 0
 3668 -3669  3670  836 -3672 0
 3668 -3669  3670  836  3673 0

c  1-1 --> 0
c    (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0 ∧ -p_836) -> (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧ -b^{1, 837}_0)
c  in CNF:
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_2
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_1
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_0
c  in DIMACS:
 3668  3669 -3670  836 -3671 0
 3668  3669 -3670  836 -3672 0
 3668  3669 -3670  836 -3673 0

c  0-1 --> -1
c    (-b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧ -p_836) -> ( b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0)
c  in CNF:
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨  b^{1, 837}_2
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_1
c     b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨  b^{1, 837}_0
c  in DIMACS:
 3668  3669  3670  836  3671 0
 3668  3669  3670  836 -3672 0
 3668  3669  3670  836  3673 0

c  -1-1 --> -2
c    ( b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧  b^{1, 836}_0 ∧ -p_836) -> ( b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0)
c  in CNF:
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨  b^{1, 837}_2
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨  b^{1, 837}_1
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨  p_836 ∨ -b^{1, 837}_0
c  in DIMACS:
-3668  3669 -3670  836  3671 0
-3668  3669 -3670  836  3672 0
-3668  3669 -3670  836 -3673 0

c  -2-1 --> break 
c    ( b^{1, 836}_2 ∧  b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨  b^{1, 836}_0 ∨  p_836 ∨ break
c  in DIMACS:
-3668 -3669  3670  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 836}_2 ∧ -b^{1, 836}_1 ∧ -b^{1, 836}_0 ∧ true) 
c  in CNF:
c    -b^{1, 836}_2 ∨  b^{1, 836}_1 ∨  b^{1, 836}_0 ∨ false 
c  in DIMACS:
-3668  3669  3670  0

c  3 does not represent an automaton state.
c    -(-b^{1, 836}_2 ∧  b^{1, 836}_1 ∧  b^{1, 836}_0 ∧ true) 
c  in CNF:
c     b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ false 
c  in DIMACS:
 3668 -3669 -3670  0
c  -3 does not represent an automaton state.
c    -( b^{1, 836}_2 ∧  b^{1, 836}_1 ∧  b^{1, 836}_0 ∧ true) 
c  in CNF:
c    -b^{1, 836}_2 ∨ -b^{1, 836}_1 ∨ -b^{1, 836}_0 ∨ false 
c  in DIMACS:
-3668 -3669 -3670  0

c i = 837
c  -2+1 --> -1
c    ( b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧  p_837) -> ( b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0)
c  in CNF:
c    -b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨  b^{1, 838}_2
c    -b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_1
c    -b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨  b^{1, 838}_0
c  in DIMACS:
-3671 -3672  3673 -837  3674 0
-3671 -3672  3673 -837 -3675 0
-3671 -3672  3673 -837  3676 0

c  -1+1 --> 0
c    ( b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0 ∧  p_837) -> (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧ -b^{1, 838}_0)
c  in CNF:
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_2
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_1
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_0
c  in DIMACS:
-3671  3672 -3673 -837 -3674 0
-3671  3672 -3673 -837 -3675 0
-3671  3672 -3673 -837 -3676 0

c  0+1 --> 1
c    (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧  p_837) -> (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0)
c  in CNF:
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_2
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_1
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨  b^{1, 838}_0
c  in DIMACS:
 3671  3672  3673 -837 -3674 0
 3671  3672  3673 -837 -3675 0
 3671  3672  3673 -837  3676 0

c  1+1 --> 2
c    (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0 ∧  p_837) -> (-b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0)
c  in CNF:
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_2
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨  b^{1, 838}_1
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ -p_837 ∨ -b^{1, 838}_0
c  in DIMACS:
 3671  3672 -3673 -837 -3674 0
 3671  3672 -3673 -837  3675 0
 3671  3672 -3673 -837 -3676 0

c  2+1 --> break 
c    (-b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧  p_837) -> break
c  in CNF:
c     b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 3671 -3672  3673 -837 1162 0


c  2-1 --> 1
c    (-b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧ -p_837) -> (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0)
c  in CNF:
c     b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_2
c     b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_1
c     b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨  b^{1, 838}_0
c  in DIMACS:
 3671 -3672  3673  837 -3674 0
 3671 -3672  3673  837 -3675 0
 3671 -3672  3673  837  3676 0

c  1-1 --> 0
c    (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0 ∧ -p_837) -> (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧ -b^{1, 838}_0)
c  in CNF:
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_2
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_1
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_0
c  in DIMACS:
 3671  3672 -3673  837 -3674 0
 3671  3672 -3673  837 -3675 0
 3671  3672 -3673  837 -3676 0

c  0-1 --> -1
c    (-b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧ -p_837) -> ( b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0)
c  in CNF:
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨  b^{1, 838}_2
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_1
c     b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨  b^{1, 838}_0
c  in DIMACS:
 3671  3672  3673  837  3674 0
 3671  3672  3673  837 -3675 0
 3671  3672  3673  837  3676 0

c  -1-1 --> -2
c    ( b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧  b^{1, 837}_0 ∧ -p_837) -> ( b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0)
c  in CNF:
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨  b^{1, 838}_2
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨  b^{1, 838}_1
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨  p_837 ∨ -b^{1, 838}_0
c  in DIMACS:
-3671  3672 -3673  837  3674 0
-3671  3672 -3673  837  3675 0
-3671  3672 -3673  837 -3676 0

c  -2-1 --> break 
c    ( b^{1, 837}_2 ∧  b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨  b^{1, 837}_0 ∨  p_837 ∨ break
c  in DIMACS:
-3671 -3672  3673  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 837}_2 ∧ -b^{1, 837}_1 ∧ -b^{1, 837}_0 ∧ true) 
c  in CNF:
c    -b^{1, 837}_2 ∨  b^{1, 837}_1 ∨  b^{1, 837}_0 ∨ false 
c  in DIMACS:
-3671  3672  3673  0

c  3 does not represent an automaton state.
c    -(-b^{1, 837}_2 ∧  b^{1, 837}_1 ∧  b^{1, 837}_0 ∧ true) 
c  in CNF:
c     b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ false 
c  in DIMACS:
 3671 -3672 -3673  0
c  -3 does not represent an automaton state.
c    -( b^{1, 837}_2 ∧  b^{1, 837}_1 ∧  b^{1, 837}_0 ∧ true) 
c  in CNF:
c    -b^{1, 837}_2 ∨ -b^{1, 837}_1 ∨ -b^{1, 837}_0 ∨ false 
c  in DIMACS:
-3671 -3672 -3673  0

c i = 838
c  -2+1 --> -1
c    ( b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧  p_838) -> ( b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0)
c  in CNF:
c    -b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨  b^{1, 839}_2
c    -b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_1
c    -b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨  b^{1, 839}_0
c  in DIMACS:
-3674 -3675  3676 -838  3677 0
-3674 -3675  3676 -838 -3678 0
-3674 -3675  3676 -838  3679 0

c  -1+1 --> 0
c    ( b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0 ∧  p_838) -> (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧ -b^{1, 839}_0)
c  in CNF:
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_2
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_1
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_0
c  in DIMACS:
-3674  3675 -3676 -838 -3677 0
-3674  3675 -3676 -838 -3678 0
-3674  3675 -3676 -838 -3679 0

c  0+1 --> 1
c    (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧  p_838) -> (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0)
c  in CNF:
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_2
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_1
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨  b^{1, 839}_0
c  in DIMACS:
 3674  3675  3676 -838 -3677 0
 3674  3675  3676 -838 -3678 0
 3674  3675  3676 -838  3679 0

c  1+1 --> 2
c    (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0 ∧  p_838) -> (-b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0)
c  in CNF:
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_2
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨  b^{1, 839}_1
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ -p_838 ∨ -b^{1, 839}_0
c  in DIMACS:
 3674  3675 -3676 -838 -3677 0
 3674  3675 -3676 -838  3678 0
 3674  3675 -3676 -838 -3679 0

c  2+1 --> break 
c    (-b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧  p_838) -> break
c  in CNF:
c     b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ -p_838 ∨ break
c  in DIMACS:
 3674 -3675  3676 -838 1162 0


c  2-1 --> 1
c    (-b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧ -p_838) -> (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0)
c  in CNF:
c     b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_2
c     b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_1
c     b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨  b^{1, 839}_0
c  in DIMACS:
 3674 -3675  3676  838 -3677 0
 3674 -3675  3676  838 -3678 0
 3674 -3675  3676  838  3679 0

c  1-1 --> 0
c    (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0 ∧ -p_838) -> (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧ -b^{1, 839}_0)
c  in CNF:
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_2
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_1
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_0
c  in DIMACS:
 3674  3675 -3676  838 -3677 0
 3674  3675 -3676  838 -3678 0
 3674  3675 -3676  838 -3679 0

c  0-1 --> -1
c    (-b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧ -p_838) -> ( b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0)
c  in CNF:
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨  b^{1, 839}_2
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_1
c     b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨  b^{1, 839}_0
c  in DIMACS:
 3674  3675  3676  838  3677 0
 3674  3675  3676  838 -3678 0
 3674  3675  3676  838  3679 0

c  -1-1 --> -2
c    ( b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧  b^{1, 838}_0 ∧ -p_838) -> ( b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0)
c  in CNF:
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨  b^{1, 839}_2
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨  b^{1, 839}_1
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨  p_838 ∨ -b^{1, 839}_0
c  in DIMACS:
-3674  3675 -3676  838  3677 0
-3674  3675 -3676  838  3678 0
-3674  3675 -3676  838 -3679 0

c  -2-1 --> break 
c    ( b^{1, 838}_2 ∧  b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧ -p_838) -> break
c  in CNF:
c    -b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨  b^{1, 838}_0 ∨  p_838 ∨ break
c  in DIMACS:
-3674 -3675  3676  838 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 838}_2 ∧ -b^{1, 838}_1 ∧ -b^{1, 838}_0 ∧ true) 
c  in CNF:
c    -b^{1, 838}_2 ∨  b^{1, 838}_1 ∨  b^{1, 838}_0 ∨ false 
c  in DIMACS:
-3674  3675  3676  0

c  3 does not represent an automaton state.
c    -(-b^{1, 838}_2 ∧  b^{1, 838}_1 ∧  b^{1, 838}_0 ∧ true) 
c  in CNF:
c     b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ false 
c  in DIMACS:
 3674 -3675 -3676  0
c  -3 does not represent an automaton state.
c    -( b^{1, 838}_2 ∧  b^{1, 838}_1 ∧  b^{1, 838}_0 ∧ true) 
c  in CNF:
c    -b^{1, 838}_2 ∨ -b^{1, 838}_1 ∨ -b^{1, 838}_0 ∨ false 
c  in DIMACS:
-3674 -3675 -3676  0

c i = 839
c  -2+1 --> -1
c    ( b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧  p_839) -> ( b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0)
c  in CNF:
c    -b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨  b^{1, 840}_2
c    -b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_1
c    -b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨  b^{1, 840}_0
c  in DIMACS:
-3677 -3678  3679 -839  3680 0
-3677 -3678  3679 -839 -3681 0
-3677 -3678  3679 -839  3682 0

c  -1+1 --> 0
c    ( b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0 ∧  p_839) -> (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧ -b^{1, 840}_0)
c  in CNF:
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_2
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_1
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_0
c  in DIMACS:
-3677  3678 -3679 -839 -3680 0
-3677  3678 -3679 -839 -3681 0
-3677  3678 -3679 -839 -3682 0

c  0+1 --> 1
c    (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧  p_839) -> (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0)
c  in CNF:
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_2
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_1
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨  b^{1, 840}_0
c  in DIMACS:
 3677  3678  3679 -839 -3680 0
 3677  3678  3679 -839 -3681 0
 3677  3678  3679 -839  3682 0

c  1+1 --> 2
c    (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0 ∧  p_839) -> (-b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0)
c  in CNF:
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_2
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨  b^{1, 840}_1
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ -p_839 ∨ -b^{1, 840}_0
c  in DIMACS:
 3677  3678 -3679 -839 -3680 0
 3677  3678 -3679 -839  3681 0
 3677  3678 -3679 -839 -3682 0

c  2+1 --> break 
c    (-b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧  p_839) -> break
c  in CNF:
c     b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ -p_839 ∨ break
c  in DIMACS:
 3677 -3678  3679 -839 1162 0


c  2-1 --> 1
c    (-b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧ -p_839) -> (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0)
c  in CNF:
c     b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_2
c     b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_1
c     b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨  b^{1, 840}_0
c  in DIMACS:
 3677 -3678  3679  839 -3680 0
 3677 -3678  3679  839 -3681 0
 3677 -3678  3679  839  3682 0

c  1-1 --> 0
c    (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0 ∧ -p_839) -> (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧ -b^{1, 840}_0)
c  in CNF:
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_2
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_1
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_0
c  in DIMACS:
 3677  3678 -3679  839 -3680 0
 3677  3678 -3679  839 -3681 0
 3677  3678 -3679  839 -3682 0

c  0-1 --> -1
c    (-b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧ -p_839) -> ( b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0)
c  in CNF:
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨  b^{1, 840}_2
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_1
c     b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨  b^{1, 840}_0
c  in DIMACS:
 3677  3678  3679  839  3680 0
 3677  3678  3679  839 -3681 0
 3677  3678  3679  839  3682 0

c  -1-1 --> -2
c    ( b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧  b^{1, 839}_0 ∧ -p_839) -> ( b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0)
c  in CNF:
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨  b^{1, 840}_2
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨  b^{1, 840}_1
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨  p_839 ∨ -b^{1, 840}_0
c  in DIMACS:
-3677  3678 -3679  839  3680 0
-3677  3678 -3679  839  3681 0
-3677  3678 -3679  839 -3682 0

c  -2-1 --> break 
c    ( b^{1, 839}_2 ∧  b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧ -p_839) -> break
c  in CNF:
c    -b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨  b^{1, 839}_0 ∨  p_839 ∨ break
c  in DIMACS:
-3677 -3678  3679  839 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 839}_2 ∧ -b^{1, 839}_1 ∧ -b^{1, 839}_0 ∧ true) 
c  in CNF:
c    -b^{1, 839}_2 ∨  b^{1, 839}_1 ∨  b^{1, 839}_0 ∨ false 
c  in DIMACS:
-3677  3678  3679  0

c  3 does not represent an automaton state.
c    -(-b^{1, 839}_2 ∧  b^{1, 839}_1 ∧  b^{1, 839}_0 ∧ true) 
c  in CNF:
c     b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ false 
c  in DIMACS:
 3677 -3678 -3679  0
c  -3 does not represent an automaton state.
c    -( b^{1, 839}_2 ∧  b^{1, 839}_1 ∧  b^{1, 839}_0 ∧ true) 
c  in CNF:
c    -b^{1, 839}_2 ∨ -b^{1, 839}_1 ∨ -b^{1, 839}_0 ∨ false 
c  in DIMACS:
-3677 -3678 -3679  0

c i = 840
c  -2+1 --> -1
c    ( b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧  p_840) -> ( b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0)
c  in CNF:
c    -b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨  b^{1, 841}_2
c    -b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_1
c    -b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨  b^{1, 841}_0
c  in DIMACS:
-3680 -3681  3682 -840  3683 0
-3680 -3681  3682 -840 -3684 0
-3680 -3681  3682 -840  3685 0

c  -1+1 --> 0
c    ( b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0 ∧  p_840) -> (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧ -b^{1, 841}_0)
c  in CNF:
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_2
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_1
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_0
c  in DIMACS:
-3680  3681 -3682 -840 -3683 0
-3680  3681 -3682 -840 -3684 0
-3680  3681 -3682 -840 -3685 0

c  0+1 --> 1
c    (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧  p_840) -> (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0)
c  in CNF:
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_2
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_1
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨  b^{1, 841}_0
c  in DIMACS:
 3680  3681  3682 -840 -3683 0
 3680  3681  3682 -840 -3684 0
 3680  3681  3682 -840  3685 0

c  1+1 --> 2
c    (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0 ∧  p_840) -> (-b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0)
c  in CNF:
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_2
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨  b^{1, 841}_1
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ -p_840 ∨ -b^{1, 841}_0
c  in DIMACS:
 3680  3681 -3682 -840 -3683 0
 3680  3681 -3682 -840  3684 0
 3680  3681 -3682 -840 -3685 0

c  2+1 --> break 
c    (-b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧  p_840) -> break
c  in CNF:
c     b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 3680 -3681  3682 -840 1162 0


c  2-1 --> 1
c    (-b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧ -p_840) -> (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0)
c  in CNF:
c     b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_2
c     b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_1
c     b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨  b^{1, 841}_0
c  in DIMACS:
 3680 -3681  3682  840 -3683 0
 3680 -3681  3682  840 -3684 0
 3680 -3681  3682  840  3685 0

c  1-1 --> 0
c    (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0 ∧ -p_840) -> (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧ -b^{1, 841}_0)
c  in CNF:
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_2
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_1
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_0
c  in DIMACS:
 3680  3681 -3682  840 -3683 0
 3680  3681 -3682  840 -3684 0
 3680  3681 -3682  840 -3685 0

c  0-1 --> -1
c    (-b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧ -p_840) -> ( b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0)
c  in CNF:
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨  b^{1, 841}_2
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_1
c     b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨  b^{1, 841}_0
c  in DIMACS:
 3680  3681  3682  840  3683 0
 3680  3681  3682  840 -3684 0
 3680  3681  3682  840  3685 0

c  -1-1 --> -2
c    ( b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧  b^{1, 840}_0 ∧ -p_840) -> ( b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0)
c  in CNF:
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨  b^{1, 841}_2
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨  b^{1, 841}_1
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨  p_840 ∨ -b^{1, 841}_0
c  in DIMACS:
-3680  3681 -3682  840  3683 0
-3680  3681 -3682  840  3684 0
-3680  3681 -3682  840 -3685 0

c  -2-1 --> break 
c    ( b^{1, 840}_2 ∧  b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨  b^{1, 840}_0 ∨  p_840 ∨ break
c  in DIMACS:
-3680 -3681  3682  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 840}_2 ∧ -b^{1, 840}_1 ∧ -b^{1, 840}_0 ∧ true) 
c  in CNF:
c    -b^{1, 840}_2 ∨  b^{1, 840}_1 ∨  b^{1, 840}_0 ∨ false 
c  in DIMACS:
-3680  3681  3682  0

c  3 does not represent an automaton state.
c    -(-b^{1, 840}_2 ∧  b^{1, 840}_1 ∧  b^{1, 840}_0 ∧ true) 
c  in CNF:
c     b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ false 
c  in DIMACS:
 3680 -3681 -3682  0
c  -3 does not represent an automaton state.
c    -( b^{1, 840}_2 ∧  b^{1, 840}_1 ∧  b^{1, 840}_0 ∧ true) 
c  in CNF:
c    -b^{1, 840}_2 ∨ -b^{1, 840}_1 ∨ -b^{1, 840}_0 ∨ false 
c  in DIMACS:
-3680 -3681 -3682  0

c i = 841
c  -2+1 --> -1
c    ( b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧  p_841) -> ( b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0)
c  in CNF:
c    -b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨  b^{1, 842}_2
c    -b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_1
c    -b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨  b^{1, 842}_0
c  in DIMACS:
-3683 -3684  3685 -841  3686 0
-3683 -3684  3685 -841 -3687 0
-3683 -3684  3685 -841  3688 0

c  -1+1 --> 0
c    ( b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0 ∧  p_841) -> (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧ -b^{1, 842}_0)
c  in CNF:
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_2
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_1
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_0
c  in DIMACS:
-3683  3684 -3685 -841 -3686 0
-3683  3684 -3685 -841 -3687 0
-3683  3684 -3685 -841 -3688 0

c  0+1 --> 1
c    (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧  p_841) -> (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0)
c  in CNF:
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_2
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_1
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨  b^{1, 842}_0
c  in DIMACS:
 3683  3684  3685 -841 -3686 0
 3683  3684  3685 -841 -3687 0
 3683  3684  3685 -841  3688 0

c  1+1 --> 2
c    (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0 ∧  p_841) -> (-b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0)
c  in CNF:
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_2
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨  b^{1, 842}_1
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ -p_841 ∨ -b^{1, 842}_0
c  in DIMACS:
 3683  3684 -3685 -841 -3686 0
 3683  3684 -3685 -841  3687 0
 3683  3684 -3685 -841 -3688 0

c  2+1 --> break 
c    (-b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧  p_841) -> break
c  in CNF:
c     b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ -p_841 ∨ break
c  in DIMACS:
 3683 -3684  3685 -841 1162 0


c  2-1 --> 1
c    (-b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧ -p_841) -> (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0)
c  in CNF:
c     b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_2
c     b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_1
c     b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨  b^{1, 842}_0
c  in DIMACS:
 3683 -3684  3685  841 -3686 0
 3683 -3684  3685  841 -3687 0
 3683 -3684  3685  841  3688 0

c  1-1 --> 0
c    (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0 ∧ -p_841) -> (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧ -b^{1, 842}_0)
c  in CNF:
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_2
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_1
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_0
c  in DIMACS:
 3683  3684 -3685  841 -3686 0
 3683  3684 -3685  841 -3687 0
 3683  3684 -3685  841 -3688 0

c  0-1 --> -1
c    (-b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧ -p_841) -> ( b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0)
c  in CNF:
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨  b^{1, 842}_2
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_1
c     b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨  b^{1, 842}_0
c  in DIMACS:
 3683  3684  3685  841  3686 0
 3683  3684  3685  841 -3687 0
 3683  3684  3685  841  3688 0

c  -1-1 --> -2
c    ( b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧  b^{1, 841}_0 ∧ -p_841) -> ( b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0)
c  in CNF:
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨  b^{1, 842}_2
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨  b^{1, 842}_1
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨  p_841 ∨ -b^{1, 842}_0
c  in DIMACS:
-3683  3684 -3685  841  3686 0
-3683  3684 -3685  841  3687 0
-3683  3684 -3685  841 -3688 0

c  -2-1 --> break 
c    ( b^{1, 841}_2 ∧  b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧ -p_841) -> break
c  in CNF:
c    -b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨  b^{1, 841}_0 ∨  p_841 ∨ break
c  in DIMACS:
-3683 -3684  3685  841 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 841}_2 ∧ -b^{1, 841}_1 ∧ -b^{1, 841}_0 ∧ true) 
c  in CNF:
c    -b^{1, 841}_2 ∨  b^{1, 841}_1 ∨  b^{1, 841}_0 ∨ false 
c  in DIMACS:
-3683  3684  3685  0

c  3 does not represent an automaton state.
c    -(-b^{1, 841}_2 ∧  b^{1, 841}_1 ∧  b^{1, 841}_0 ∧ true) 
c  in CNF:
c     b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ false 
c  in DIMACS:
 3683 -3684 -3685  0
c  -3 does not represent an automaton state.
c    -( b^{1, 841}_2 ∧  b^{1, 841}_1 ∧  b^{1, 841}_0 ∧ true) 
c  in CNF:
c    -b^{1, 841}_2 ∨ -b^{1, 841}_1 ∨ -b^{1, 841}_0 ∨ false 
c  in DIMACS:
-3683 -3684 -3685  0

c i = 842
c  -2+1 --> -1
c    ( b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧  p_842) -> ( b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0)
c  in CNF:
c    -b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨  b^{1, 843}_2
c    -b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_1
c    -b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨  b^{1, 843}_0
c  in DIMACS:
-3686 -3687  3688 -842  3689 0
-3686 -3687  3688 -842 -3690 0
-3686 -3687  3688 -842  3691 0

c  -1+1 --> 0
c    ( b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0 ∧  p_842) -> (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧ -b^{1, 843}_0)
c  in CNF:
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_2
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_1
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_0
c  in DIMACS:
-3686  3687 -3688 -842 -3689 0
-3686  3687 -3688 -842 -3690 0
-3686  3687 -3688 -842 -3691 0

c  0+1 --> 1
c    (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧  p_842) -> (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0)
c  in CNF:
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_2
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_1
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨  b^{1, 843}_0
c  in DIMACS:
 3686  3687  3688 -842 -3689 0
 3686  3687  3688 -842 -3690 0
 3686  3687  3688 -842  3691 0

c  1+1 --> 2
c    (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0 ∧  p_842) -> (-b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0)
c  in CNF:
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_2
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨  b^{1, 843}_1
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ -p_842 ∨ -b^{1, 843}_0
c  in DIMACS:
 3686  3687 -3688 -842 -3689 0
 3686  3687 -3688 -842  3690 0
 3686  3687 -3688 -842 -3691 0

c  2+1 --> break 
c    (-b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧  p_842) -> break
c  in CNF:
c     b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ -p_842 ∨ break
c  in DIMACS:
 3686 -3687  3688 -842 1162 0


c  2-1 --> 1
c    (-b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧ -p_842) -> (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0)
c  in CNF:
c     b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_2
c     b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_1
c     b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨  b^{1, 843}_0
c  in DIMACS:
 3686 -3687  3688  842 -3689 0
 3686 -3687  3688  842 -3690 0
 3686 -3687  3688  842  3691 0

c  1-1 --> 0
c    (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0 ∧ -p_842) -> (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧ -b^{1, 843}_0)
c  in CNF:
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_2
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_1
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_0
c  in DIMACS:
 3686  3687 -3688  842 -3689 0
 3686  3687 -3688  842 -3690 0
 3686  3687 -3688  842 -3691 0

c  0-1 --> -1
c    (-b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧ -p_842) -> ( b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0)
c  in CNF:
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨  b^{1, 843}_2
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_1
c     b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨  b^{1, 843}_0
c  in DIMACS:
 3686  3687  3688  842  3689 0
 3686  3687  3688  842 -3690 0
 3686  3687  3688  842  3691 0

c  -1-1 --> -2
c    ( b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧  b^{1, 842}_0 ∧ -p_842) -> ( b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0)
c  in CNF:
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨  b^{1, 843}_2
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨  b^{1, 843}_1
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨  p_842 ∨ -b^{1, 843}_0
c  in DIMACS:
-3686  3687 -3688  842  3689 0
-3686  3687 -3688  842  3690 0
-3686  3687 -3688  842 -3691 0

c  -2-1 --> break 
c    ( b^{1, 842}_2 ∧  b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧ -p_842) -> break
c  in CNF:
c    -b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨  b^{1, 842}_0 ∨  p_842 ∨ break
c  in DIMACS:
-3686 -3687  3688  842 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 842}_2 ∧ -b^{1, 842}_1 ∧ -b^{1, 842}_0 ∧ true) 
c  in CNF:
c    -b^{1, 842}_2 ∨  b^{1, 842}_1 ∨  b^{1, 842}_0 ∨ false 
c  in DIMACS:
-3686  3687  3688  0

c  3 does not represent an automaton state.
c    -(-b^{1, 842}_2 ∧  b^{1, 842}_1 ∧  b^{1, 842}_0 ∧ true) 
c  in CNF:
c     b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ false 
c  in DIMACS:
 3686 -3687 -3688  0
c  -3 does not represent an automaton state.
c    -( b^{1, 842}_2 ∧  b^{1, 842}_1 ∧  b^{1, 842}_0 ∧ true) 
c  in CNF:
c    -b^{1, 842}_2 ∨ -b^{1, 842}_1 ∨ -b^{1, 842}_0 ∨ false 
c  in DIMACS:
-3686 -3687 -3688  0

c i = 843
c  -2+1 --> -1
c    ( b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧  p_843) -> ( b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0)
c  in CNF:
c    -b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨  b^{1, 844}_2
c    -b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_1
c    -b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨  b^{1, 844}_0
c  in DIMACS:
-3689 -3690  3691 -843  3692 0
-3689 -3690  3691 -843 -3693 0
-3689 -3690  3691 -843  3694 0

c  -1+1 --> 0
c    ( b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0 ∧  p_843) -> (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧ -b^{1, 844}_0)
c  in CNF:
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_2
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_1
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_0
c  in DIMACS:
-3689  3690 -3691 -843 -3692 0
-3689  3690 -3691 -843 -3693 0
-3689  3690 -3691 -843 -3694 0

c  0+1 --> 1
c    (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧  p_843) -> (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0)
c  in CNF:
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_2
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_1
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨  b^{1, 844}_0
c  in DIMACS:
 3689  3690  3691 -843 -3692 0
 3689  3690  3691 -843 -3693 0
 3689  3690  3691 -843  3694 0

c  1+1 --> 2
c    (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0 ∧  p_843) -> (-b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0)
c  in CNF:
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_2
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨  b^{1, 844}_1
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ -p_843 ∨ -b^{1, 844}_0
c  in DIMACS:
 3689  3690 -3691 -843 -3692 0
 3689  3690 -3691 -843  3693 0
 3689  3690 -3691 -843 -3694 0

c  2+1 --> break 
c    (-b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧  p_843) -> break
c  in CNF:
c     b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ -p_843 ∨ break
c  in DIMACS:
 3689 -3690  3691 -843 1162 0


c  2-1 --> 1
c    (-b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧ -p_843) -> (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0)
c  in CNF:
c     b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_2
c     b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_1
c     b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨  b^{1, 844}_0
c  in DIMACS:
 3689 -3690  3691  843 -3692 0
 3689 -3690  3691  843 -3693 0
 3689 -3690  3691  843  3694 0

c  1-1 --> 0
c    (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0 ∧ -p_843) -> (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧ -b^{1, 844}_0)
c  in CNF:
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_2
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_1
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_0
c  in DIMACS:
 3689  3690 -3691  843 -3692 0
 3689  3690 -3691  843 -3693 0
 3689  3690 -3691  843 -3694 0

c  0-1 --> -1
c    (-b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧ -p_843) -> ( b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0)
c  in CNF:
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨  b^{1, 844}_2
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_1
c     b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨  b^{1, 844}_0
c  in DIMACS:
 3689  3690  3691  843  3692 0
 3689  3690  3691  843 -3693 0
 3689  3690  3691  843  3694 0

c  -1-1 --> -2
c    ( b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧  b^{1, 843}_0 ∧ -p_843) -> ( b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0)
c  in CNF:
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨  b^{1, 844}_2
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨  b^{1, 844}_1
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨  p_843 ∨ -b^{1, 844}_0
c  in DIMACS:
-3689  3690 -3691  843  3692 0
-3689  3690 -3691  843  3693 0
-3689  3690 -3691  843 -3694 0

c  -2-1 --> break 
c    ( b^{1, 843}_2 ∧  b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧ -p_843) -> break
c  in CNF:
c    -b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨  b^{1, 843}_0 ∨  p_843 ∨ break
c  in DIMACS:
-3689 -3690  3691  843 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 843}_2 ∧ -b^{1, 843}_1 ∧ -b^{1, 843}_0 ∧ true) 
c  in CNF:
c    -b^{1, 843}_2 ∨  b^{1, 843}_1 ∨  b^{1, 843}_0 ∨ false 
c  in DIMACS:
-3689  3690  3691  0

c  3 does not represent an automaton state.
c    -(-b^{1, 843}_2 ∧  b^{1, 843}_1 ∧  b^{1, 843}_0 ∧ true) 
c  in CNF:
c     b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ false 
c  in DIMACS:
 3689 -3690 -3691  0
c  -3 does not represent an automaton state.
c    -( b^{1, 843}_2 ∧  b^{1, 843}_1 ∧  b^{1, 843}_0 ∧ true) 
c  in CNF:
c    -b^{1, 843}_2 ∨ -b^{1, 843}_1 ∨ -b^{1, 843}_0 ∨ false 
c  in DIMACS:
-3689 -3690 -3691  0

c i = 844
c  -2+1 --> -1
c    ( b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧  p_844) -> ( b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0)
c  in CNF:
c    -b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨  b^{1, 845}_2
c    -b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_1
c    -b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨  b^{1, 845}_0
c  in DIMACS:
-3692 -3693  3694 -844  3695 0
-3692 -3693  3694 -844 -3696 0
-3692 -3693  3694 -844  3697 0

c  -1+1 --> 0
c    ( b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0 ∧  p_844) -> (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧ -b^{1, 845}_0)
c  in CNF:
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_2
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_1
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_0
c  in DIMACS:
-3692  3693 -3694 -844 -3695 0
-3692  3693 -3694 -844 -3696 0
-3692  3693 -3694 -844 -3697 0

c  0+1 --> 1
c    (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧  p_844) -> (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0)
c  in CNF:
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_2
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_1
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨  b^{1, 845}_0
c  in DIMACS:
 3692  3693  3694 -844 -3695 0
 3692  3693  3694 -844 -3696 0
 3692  3693  3694 -844  3697 0

c  1+1 --> 2
c    (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0 ∧  p_844) -> (-b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0)
c  in CNF:
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_2
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨  b^{1, 845}_1
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ -p_844 ∨ -b^{1, 845}_0
c  in DIMACS:
 3692  3693 -3694 -844 -3695 0
 3692  3693 -3694 -844  3696 0
 3692  3693 -3694 -844 -3697 0

c  2+1 --> break 
c    (-b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧  p_844) -> break
c  in CNF:
c     b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ -p_844 ∨ break
c  in DIMACS:
 3692 -3693  3694 -844 1162 0


c  2-1 --> 1
c    (-b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧ -p_844) -> (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0)
c  in CNF:
c     b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_2
c     b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_1
c     b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨  b^{1, 845}_0
c  in DIMACS:
 3692 -3693  3694  844 -3695 0
 3692 -3693  3694  844 -3696 0
 3692 -3693  3694  844  3697 0

c  1-1 --> 0
c    (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0 ∧ -p_844) -> (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧ -b^{1, 845}_0)
c  in CNF:
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_2
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_1
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_0
c  in DIMACS:
 3692  3693 -3694  844 -3695 0
 3692  3693 -3694  844 -3696 0
 3692  3693 -3694  844 -3697 0

c  0-1 --> -1
c    (-b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧ -p_844) -> ( b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0)
c  in CNF:
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨  b^{1, 845}_2
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_1
c     b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨  b^{1, 845}_0
c  in DIMACS:
 3692  3693  3694  844  3695 0
 3692  3693  3694  844 -3696 0
 3692  3693  3694  844  3697 0

c  -1-1 --> -2
c    ( b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧  b^{1, 844}_0 ∧ -p_844) -> ( b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0)
c  in CNF:
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨  b^{1, 845}_2
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨  b^{1, 845}_1
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨  p_844 ∨ -b^{1, 845}_0
c  in DIMACS:
-3692  3693 -3694  844  3695 0
-3692  3693 -3694  844  3696 0
-3692  3693 -3694  844 -3697 0

c  -2-1 --> break 
c    ( b^{1, 844}_2 ∧  b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧ -p_844) -> break
c  in CNF:
c    -b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨  b^{1, 844}_0 ∨  p_844 ∨ break
c  in DIMACS:
-3692 -3693  3694  844 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 844}_2 ∧ -b^{1, 844}_1 ∧ -b^{1, 844}_0 ∧ true) 
c  in CNF:
c    -b^{1, 844}_2 ∨  b^{1, 844}_1 ∨  b^{1, 844}_0 ∨ false 
c  in DIMACS:
-3692  3693  3694  0

c  3 does not represent an automaton state.
c    -(-b^{1, 844}_2 ∧  b^{1, 844}_1 ∧  b^{1, 844}_0 ∧ true) 
c  in CNF:
c     b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ false 
c  in DIMACS:
 3692 -3693 -3694  0
c  -3 does not represent an automaton state.
c    -( b^{1, 844}_2 ∧  b^{1, 844}_1 ∧  b^{1, 844}_0 ∧ true) 
c  in CNF:
c    -b^{1, 844}_2 ∨ -b^{1, 844}_1 ∨ -b^{1, 844}_0 ∨ false 
c  in DIMACS:
-3692 -3693 -3694  0

c i = 845
c  -2+1 --> -1
c    ( b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧  p_845) -> ( b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0)
c  in CNF:
c    -b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨  b^{1, 846}_2
c    -b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_1
c    -b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨  b^{1, 846}_0
c  in DIMACS:
-3695 -3696  3697 -845  3698 0
-3695 -3696  3697 -845 -3699 0
-3695 -3696  3697 -845  3700 0

c  -1+1 --> 0
c    ( b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0 ∧  p_845) -> (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧ -b^{1, 846}_0)
c  in CNF:
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_2
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_1
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_0
c  in DIMACS:
-3695  3696 -3697 -845 -3698 0
-3695  3696 -3697 -845 -3699 0
-3695  3696 -3697 -845 -3700 0

c  0+1 --> 1
c    (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧  p_845) -> (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0)
c  in CNF:
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_2
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_1
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨  b^{1, 846}_0
c  in DIMACS:
 3695  3696  3697 -845 -3698 0
 3695  3696  3697 -845 -3699 0
 3695  3696  3697 -845  3700 0

c  1+1 --> 2
c    (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0 ∧  p_845) -> (-b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0)
c  in CNF:
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_2
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨  b^{1, 846}_1
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ -p_845 ∨ -b^{1, 846}_0
c  in DIMACS:
 3695  3696 -3697 -845 -3698 0
 3695  3696 -3697 -845  3699 0
 3695  3696 -3697 -845 -3700 0

c  2+1 --> break 
c    (-b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧  p_845) -> break
c  in CNF:
c     b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ -p_845 ∨ break
c  in DIMACS:
 3695 -3696  3697 -845 1162 0


c  2-1 --> 1
c    (-b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧ -p_845) -> (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0)
c  in CNF:
c     b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_2
c     b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_1
c     b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨  b^{1, 846}_0
c  in DIMACS:
 3695 -3696  3697  845 -3698 0
 3695 -3696  3697  845 -3699 0
 3695 -3696  3697  845  3700 0

c  1-1 --> 0
c    (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0 ∧ -p_845) -> (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧ -b^{1, 846}_0)
c  in CNF:
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_2
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_1
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_0
c  in DIMACS:
 3695  3696 -3697  845 -3698 0
 3695  3696 -3697  845 -3699 0
 3695  3696 -3697  845 -3700 0

c  0-1 --> -1
c    (-b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧ -p_845) -> ( b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0)
c  in CNF:
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨  b^{1, 846}_2
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_1
c     b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨  b^{1, 846}_0
c  in DIMACS:
 3695  3696  3697  845  3698 0
 3695  3696  3697  845 -3699 0
 3695  3696  3697  845  3700 0

c  -1-1 --> -2
c    ( b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧  b^{1, 845}_0 ∧ -p_845) -> ( b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0)
c  in CNF:
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨  b^{1, 846}_2
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨  b^{1, 846}_1
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨  p_845 ∨ -b^{1, 846}_0
c  in DIMACS:
-3695  3696 -3697  845  3698 0
-3695  3696 -3697  845  3699 0
-3695  3696 -3697  845 -3700 0

c  -2-1 --> break 
c    ( b^{1, 845}_2 ∧  b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧ -p_845) -> break
c  in CNF:
c    -b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨  b^{1, 845}_0 ∨  p_845 ∨ break
c  in DIMACS:
-3695 -3696  3697  845 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 845}_2 ∧ -b^{1, 845}_1 ∧ -b^{1, 845}_0 ∧ true) 
c  in CNF:
c    -b^{1, 845}_2 ∨  b^{1, 845}_1 ∨  b^{1, 845}_0 ∨ false 
c  in DIMACS:
-3695  3696  3697  0

c  3 does not represent an automaton state.
c    -(-b^{1, 845}_2 ∧  b^{1, 845}_1 ∧  b^{1, 845}_0 ∧ true) 
c  in CNF:
c     b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ false 
c  in DIMACS:
 3695 -3696 -3697  0
c  -3 does not represent an automaton state.
c    -( b^{1, 845}_2 ∧  b^{1, 845}_1 ∧  b^{1, 845}_0 ∧ true) 
c  in CNF:
c    -b^{1, 845}_2 ∨ -b^{1, 845}_1 ∨ -b^{1, 845}_0 ∨ false 
c  in DIMACS:
-3695 -3696 -3697  0

c i = 846
c  -2+1 --> -1
c    ( b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧  p_846) -> ( b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0)
c  in CNF:
c    -b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨  b^{1, 847}_2
c    -b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_1
c    -b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨  b^{1, 847}_0
c  in DIMACS:
-3698 -3699  3700 -846  3701 0
-3698 -3699  3700 -846 -3702 0
-3698 -3699  3700 -846  3703 0

c  -1+1 --> 0
c    ( b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0 ∧  p_846) -> (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧ -b^{1, 847}_0)
c  in CNF:
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_2
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_1
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_0
c  in DIMACS:
-3698  3699 -3700 -846 -3701 0
-3698  3699 -3700 -846 -3702 0
-3698  3699 -3700 -846 -3703 0

c  0+1 --> 1
c    (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧  p_846) -> (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0)
c  in CNF:
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_2
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_1
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨  b^{1, 847}_0
c  in DIMACS:
 3698  3699  3700 -846 -3701 0
 3698  3699  3700 -846 -3702 0
 3698  3699  3700 -846  3703 0

c  1+1 --> 2
c    (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0 ∧  p_846) -> (-b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0)
c  in CNF:
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_2
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨  b^{1, 847}_1
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ -p_846 ∨ -b^{1, 847}_0
c  in DIMACS:
 3698  3699 -3700 -846 -3701 0
 3698  3699 -3700 -846  3702 0
 3698  3699 -3700 -846 -3703 0

c  2+1 --> break 
c    (-b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧  p_846) -> break
c  in CNF:
c     b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 3698 -3699  3700 -846 1162 0


c  2-1 --> 1
c    (-b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧ -p_846) -> (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0)
c  in CNF:
c     b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_2
c     b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_1
c     b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨  b^{1, 847}_0
c  in DIMACS:
 3698 -3699  3700  846 -3701 0
 3698 -3699  3700  846 -3702 0
 3698 -3699  3700  846  3703 0

c  1-1 --> 0
c    (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0 ∧ -p_846) -> (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧ -b^{1, 847}_0)
c  in CNF:
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_2
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_1
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_0
c  in DIMACS:
 3698  3699 -3700  846 -3701 0
 3698  3699 -3700  846 -3702 0
 3698  3699 -3700  846 -3703 0

c  0-1 --> -1
c    (-b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧ -p_846) -> ( b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0)
c  in CNF:
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨  b^{1, 847}_2
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_1
c     b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨  b^{1, 847}_0
c  in DIMACS:
 3698  3699  3700  846  3701 0
 3698  3699  3700  846 -3702 0
 3698  3699  3700  846  3703 0

c  -1-1 --> -2
c    ( b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧  b^{1, 846}_0 ∧ -p_846) -> ( b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0)
c  in CNF:
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨  b^{1, 847}_2
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨  b^{1, 847}_1
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨  p_846 ∨ -b^{1, 847}_0
c  in DIMACS:
-3698  3699 -3700  846  3701 0
-3698  3699 -3700  846  3702 0
-3698  3699 -3700  846 -3703 0

c  -2-1 --> break 
c    ( b^{1, 846}_2 ∧  b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨  b^{1, 846}_0 ∨  p_846 ∨ break
c  in DIMACS:
-3698 -3699  3700  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 846}_2 ∧ -b^{1, 846}_1 ∧ -b^{1, 846}_0 ∧ true) 
c  in CNF:
c    -b^{1, 846}_2 ∨  b^{1, 846}_1 ∨  b^{1, 846}_0 ∨ false 
c  in DIMACS:
-3698  3699  3700  0

c  3 does not represent an automaton state.
c    -(-b^{1, 846}_2 ∧  b^{1, 846}_1 ∧  b^{1, 846}_0 ∧ true) 
c  in CNF:
c     b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ false 
c  in DIMACS:
 3698 -3699 -3700  0
c  -3 does not represent an automaton state.
c    -( b^{1, 846}_2 ∧  b^{1, 846}_1 ∧  b^{1, 846}_0 ∧ true) 
c  in CNF:
c    -b^{1, 846}_2 ∨ -b^{1, 846}_1 ∨ -b^{1, 846}_0 ∨ false 
c  in DIMACS:
-3698 -3699 -3700  0

c i = 847
c  -2+1 --> -1
c    ( b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧  p_847) -> ( b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0)
c  in CNF:
c    -b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨  b^{1, 848}_2
c    -b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_1
c    -b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨  b^{1, 848}_0
c  in DIMACS:
-3701 -3702  3703 -847  3704 0
-3701 -3702  3703 -847 -3705 0
-3701 -3702  3703 -847  3706 0

c  -1+1 --> 0
c    ( b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0 ∧  p_847) -> (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧ -b^{1, 848}_0)
c  in CNF:
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_2
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_1
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_0
c  in DIMACS:
-3701  3702 -3703 -847 -3704 0
-3701  3702 -3703 -847 -3705 0
-3701  3702 -3703 -847 -3706 0

c  0+1 --> 1
c    (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧  p_847) -> (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0)
c  in CNF:
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_2
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_1
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨  b^{1, 848}_0
c  in DIMACS:
 3701  3702  3703 -847 -3704 0
 3701  3702  3703 -847 -3705 0
 3701  3702  3703 -847  3706 0

c  1+1 --> 2
c    (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0 ∧  p_847) -> (-b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0)
c  in CNF:
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_2
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨  b^{1, 848}_1
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ -p_847 ∨ -b^{1, 848}_0
c  in DIMACS:
 3701  3702 -3703 -847 -3704 0
 3701  3702 -3703 -847  3705 0
 3701  3702 -3703 -847 -3706 0

c  2+1 --> break 
c    (-b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧  p_847) -> break
c  in CNF:
c     b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ -p_847 ∨ break
c  in DIMACS:
 3701 -3702  3703 -847 1162 0


c  2-1 --> 1
c    (-b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧ -p_847) -> (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0)
c  in CNF:
c     b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_2
c     b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_1
c     b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨  b^{1, 848}_0
c  in DIMACS:
 3701 -3702  3703  847 -3704 0
 3701 -3702  3703  847 -3705 0
 3701 -3702  3703  847  3706 0

c  1-1 --> 0
c    (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0 ∧ -p_847) -> (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧ -b^{1, 848}_0)
c  in CNF:
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_2
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_1
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_0
c  in DIMACS:
 3701  3702 -3703  847 -3704 0
 3701  3702 -3703  847 -3705 0
 3701  3702 -3703  847 -3706 0

c  0-1 --> -1
c    (-b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧ -p_847) -> ( b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0)
c  in CNF:
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨  b^{1, 848}_2
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_1
c     b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨  b^{1, 848}_0
c  in DIMACS:
 3701  3702  3703  847  3704 0
 3701  3702  3703  847 -3705 0
 3701  3702  3703  847  3706 0

c  -1-1 --> -2
c    ( b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧  b^{1, 847}_0 ∧ -p_847) -> ( b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0)
c  in CNF:
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨  b^{1, 848}_2
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨  b^{1, 848}_1
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨  p_847 ∨ -b^{1, 848}_0
c  in DIMACS:
-3701  3702 -3703  847  3704 0
-3701  3702 -3703  847  3705 0
-3701  3702 -3703  847 -3706 0

c  -2-1 --> break 
c    ( b^{1, 847}_2 ∧  b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧ -p_847) -> break
c  in CNF:
c    -b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨  b^{1, 847}_0 ∨  p_847 ∨ break
c  in DIMACS:
-3701 -3702  3703  847 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 847}_2 ∧ -b^{1, 847}_1 ∧ -b^{1, 847}_0 ∧ true) 
c  in CNF:
c    -b^{1, 847}_2 ∨  b^{1, 847}_1 ∨  b^{1, 847}_0 ∨ false 
c  in DIMACS:
-3701  3702  3703  0

c  3 does not represent an automaton state.
c    -(-b^{1, 847}_2 ∧  b^{1, 847}_1 ∧  b^{1, 847}_0 ∧ true) 
c  in CNF:
c     b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ false 
c  in DIMACS:
 3701 -3702 -3703  0
c  -3 does not represent an automaton state.
c    -( b^{1, 847}_2 ∧  b^{1, 847}_1 ∧  b^{1, 847}_0 ∧ true) 
c  in CNF:
c    -b^{1, 847}_2 ∨ -b^{1, 847}_1 ∨ -b^{1, 847}_0 ∨ false 
c  in DIMACS:
-3701 -3702 -3703  0

c i = 848
c  -2+1 --> -1
c    ( b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧  p_848) -> ( b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0)
c  in CNF:
c    -b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨  b^{1, 849}_2
c    -b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_1
c    -b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨  b^{1, 849}_0
c  in DIMACS:
-3704 -3705  3706 -848  3707 0
-3704 -3705  3706 -848 -3708 0
-3704 -3705  3706 -848  3709 0

c  -1+1 --> 0
c    ( b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0 ∧  p_848) -> (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧ -b^{1, 849}_0)
c  in CNF:
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_2
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_1
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_0
c  in DIMACS:
-3704  3705 -3706 -848 -3707 0
-3704  3705 -3706 -848 -3708 0
-3704  3705 -3706 -848 -3709 0

c  0+1 --> 1
c    (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧  p_848) -> (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0)
c  in CNF:
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_2
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_1
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨  b^{1, 849}_0
c  in DIMACS:
 3704  3705  3706 -848 -3707 0
 3704  3705  3706 -848 -3708 0
 3704  3705  3706 -848  3709 0

c  1+1 --> 2
c    (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0 ∧  p_848) -> (-b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0)
c  in CNF:
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_2
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨  b^{1, 849}_1
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ -p_848 ∨ -b^{1, 849}_0
c  in DIMACS:
 3704  3705 -3706 -848 -3707 0
 3704  3705 -3706 -848  3708 0
 3704  3705 -3706 -848 -3709 0

c  2+1 --> break 
c    (-b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧  p_848) -> break
c  in CNF:
c     b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 3704 -3705  3706 -848 1162 0


c  2-1 --> 1
c    (-b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧ -p_848) -> (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0)
c  in CNF:
c     b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_2
c     b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_1
c     b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨  b^{1, 849}_0
c  in DIMACS:
 3704 -3705  3706  848 -3707 0
 3704 -3705  3706  848 -3708 0
 3704 -3705  3706  848  3709 0

c  1-1 --> 0
c    (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0 ∧ -p_848) -> (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧ -b^{1, 849}_0)
c  in CNF:
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_2
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_1
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_0
c  in DIMACS:
 3704  3705 -3706  848 -3707 0
 3704  3705 -3706  848 -3708 0
 3704  3705 -3706  848 -3709 0

c  0-1 --> -1
c    (-b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧ -p_848) -> ( b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0)
c  in CNF:
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨  b^{1, 849}_2
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_1
c     b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨  b^{1, 849}_0
c  in DIMACS:
 3704  3705  3706  848  3707 0
 3704  3705  3706  848 -3708 0
 3704  3705  3706  848  3709 0

c  -1-1 --> -2
c    ( b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧  b^{1, 848}_0 ∧ -p_848) -> ( b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0)
c  in CNF:
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨  b^{1, 849}_2
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨  b^{1, 849}_1
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨  p_848 ∨ -b^{1, 849}_0
c  in DIMACS:
-3704  3705 -3706  848  3707 0
-3704  3705 -3706  848  3708 0
-3704  3705 -3706  848 -3709 0

c  -2-1 --> break 
c    ( b^{1, 848}_2 ∧  b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨  b^{1, 848}_0 ∨  p_848 ∨ break
c  in DIMACS:
-3704 -3705  3706  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 848}_2 ∧ -b^{1, 848}_1 ∧ -b^{1, 848}_0 ∧ true) 
c  in CNF:
c    -b^{1, 848}_2 ∨  b^{1, 848}_1 ∨  b^{1, 848}_0 ∨ false 
c  in DIMACS:
-3704  3705  3706  0

c  3 does not represent an automaton state.
c    -(-b^{1, 848}_2 ∧  b^{1, 848}_1 ∧  b^{1, 848}_0 ∧ true) 
c  in CNF:
c     b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ false 
c  in DIMACS:
 3704 -3705 -3706  0
c  -3 does not represent an automaton state.
c    -( b^{1, 848}_2 ∧  b^{1, 848}_1 ∧  b^{1, 848}_0 ∧ true) 
c  in CNF:
c    -b^{1, 848}_2 ∨ -b^{1, 848}_1 ∨ -b^{1, 848}_0 ∨ false 
c  in DIMACS:
-3704 -3705 -3706  0

c i = 849
c  -2+1 --> -1
c    ( b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧  p_849) -> ( b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0)
c  in CNF:
c    -b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨  b^{1, 850}_2
c    -b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_1
c    -b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨  b^{1, 850}_0
c  in DIMACS:
-3707 -3708  3709 -849  3710 0
-3707 -3708  3709 -849 -3711 0
-3707 -3708  3709 -849  3712 0

c  -1+1 --> 0
c    ( b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0 ∧  p_849) -> (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧ -b^{1, 850}_0)
c  in CNF:
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_2
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_1
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_0
c  in DIMACS:
-3707  3708 -3709 -849 -3710 0
-3707  3708 -3709 -849 -3711 0
-3707  3708 -3709 -849 -3712 0

c  0+1 --> 1
c    (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧  p_849) -> (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0)
c  in CNF:
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_2
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_1
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨  b^{1, 850}_0
c  in DIMACS:
 3707  3708  3709 -849 -3710 0
 3707  3708  3709 -849 -3711 0
 3707  3708  3709 -849  3712 0

c  1+1 --> 2
c    (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0 ∧  p_849) -> (-b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0)
c  in CNF:
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_2
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨  b^{1, 850}_1
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ -p_849 ∨ -b^{1, 850}_0
c  in DIMACS:
 3707  3708 -3709 -849 -3710 0
 3707  3708 -3709 -849  3711 0
 3707  3708 -3709 -849 -3712 0

c  2+1 --> break 
c    (-b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧  p_849) -> break
c  in CNF:
c     b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ -p_849 ∨ break
c  in DIMACS:
 3707 -3708  3709 -849 1162 0


c  2-1 --> 1
c    (-b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧ -p_849) -> (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0)
c  in CNF:
c     b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_2
c     b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_1
c     b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨  b^{1, 850}_0
c  in DIMACS:
 3707 -3708  3709  849 -3710 0
 3707 -3708  3709  849 -3711 0
 3707 -3708  3709  849  3712 0

c  1-1 --> 0
c    (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0 ∧ -p_849) -> (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧ -b^{1, 850}_0)
c  in CNF:
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_2
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_1
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_0
c  in DIMACS:
 3707  3708 -3709  849 -3710 0
 3707  3708 -3709  849 -3711 0
 3707  3708 -3709  849 -3712 0

c  0-1 --> -1
c    (-b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧ -p_849) -> ( b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0)
c  in CNF:
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨  b^{1, 850}_2
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_1
c     b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨  b^{1, 850}_0
c  in DIMACS:
 3707  3708  3709  849  3710 0
 3707  3708  3709  849 -3711 0
 3707  3708  3709  849  3712 0

c  -1-1 --> -2
c    ( b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧  b^{1, 849}_0 ∧ -p_849) -> ( b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0)
c  in CNF:
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨  b^{1, 850}_2
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨  b^{1, 850}_1
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨  p_849 ∨ -b^{1, 850}_0
c  in DIMACS:
-3707  3708 -3709  849  3710 0
-3707  3708 -3709  849  3711 0
-3707  3708 -3709  849 -3712 0

c  -2-1 --> break 
c    ( b^{1, 849}_2 ∧  b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧ -p_849) -> break
c  in CNF:
c    -b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨  b^{1, 849}_0 ∨  p_849 ∨ break
c  in DIMACS:
-3707 -3708  3709  849 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 849}_2 ∧ -b^{1, 849}_1 ∧ -b^{1, 849}_0 ∧ true) 
c  in CNF:
c    -b^{1, 849}_2 ∨  b^{1, 849}_1 ∨  b^{1, 849}_0 ∨ false 
c  in DIMACS:
-3707  3708  3709  0

c  3 does not represent an automaton state.
c    -(-b^{1, 849}_2 ∧  b^{1, 849}_1 ∧  b^{1, 849}_0 ∧ true) 
c  in CNF:
c     b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ false 
c  in DIMACS:
 3707 -3708 -3709  0
c  -3 does not represent an automaton state.
c    -( b^{1, 849}_2 ∧  b^{1, 849}_1 ∧  b^{1, 849}_0 ∧ true) 
c  in CNF:
c    -b^{1, 849}_2 ∨ -b^{1, 849}_1 ∨ -b^{1, 849}_0 ∨ false 
c  in DIMACS:
-3707 -3708 -3709  0

c i = 850
c  -2+1 --> -1
c    ( b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧  p_850) -> ( b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0)
c  in CNF:
c    -b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨  b^{1, 851}_2
c    -b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_1
c    -b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨  b^{1, 851}_0
c  in DIMACS:
-3710 -3711  3712 -850  3713 0
-3710 -3711  3712 -850 -3714 0
-3710 -3711  3712 -850  3715 0

c  -1+1 --> 0
c    ( b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0 ∧  p_850) -> (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧ -b^{1, 851}_0)
c  in CNF:
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_2
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_1
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_0
c  in DIMACS:
-3710  3711 -3712 -850 -3713 0
-3710  3711 -3712 -850 -3714 0
-3710  3711 -3712 -850 -3715 0

c  0+1 --> 1
c    (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧  p_850) -> (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0)
c  in CNF:
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_2
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_1
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨  b^{1, 851}_0
c  in DIMACS:
 3710  3711  3712 -850 -3713 0
 3710  3711  3712 -850 -3714 0
 3710  3711  3712 -850  3715 0

c  1+1 --> 2
c    (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0 ∧  p_850) -> (-b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0)
c  in CNF:
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_2
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨  b^{1, 851}_1
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ -p_850 ∨ -b^{1, 851}_0
c  in DIMACS:
 3710  3711 -3712 -850 -3713 0
 3710  3711 -3712 -850  3714 0
 3710  3711 -3712 -850 -3715 0

c  2+1 --> break 
c    (-b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧  p_850) -> break
c  in CNF:
c     b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 3710 -3711  3712 -850 1162 0


c  2-1 --> 1
c    (-b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧ -p_850) -> (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0)
c  in CNF:
c     b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_2
c     b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_1
c     b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨  b^{1, 851}_0
c  in DIMACS:
 3710 -3711  3712  850 -3713 0
 3710 -3711  3712  850 -3714 0
 3710 -3711  3712  850  3715 0

c  1-1 --> 0
c    (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0 ∧ -p_850) -> (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧ -b^{1, 851}_0)
c  in CNF:
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_2
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_1
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_0
c  in DIMACS:
 3710  3711 -3712  850 -3713 0
 3710  3711 -3712  850 -3714 0
 3710  3711 -3712  850 -3715 0

c  0-1 --> -1
c    (-b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧ -p_850) -> ( b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0)
c  in CNF:
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨  b^{1, 851}_2
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_1
c     b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨  b^{1, 851}_0
c  in DIMACS:
 3710  3711  3712  850  3713 0
 3710  3711  3712  850 -3714 0
 3710  3711  3712  850  3715 0

c  -1-1 --> -2
c    ( b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧  b^{1, 850}_0 ∧ -p_850) -> ( b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0)
c  in CNF:
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨  b^{1, 851}_2
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨  b^{1, 851}_1
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨  p_850 ∨ -b^{1, 851}_0
c  in DIMACS:
-3710  3711 -3712  850  3713 0
-3710  3711 -3712  850  3714 0
-3710  3711 -3712  850 -3715 0

c  -2-1 --> break 
c    ( b^{1, 850}_2 ∧  b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨  b^{1, 850}_0 ∨  p_850 ∨ break
c  in DIMACS:
-3710 -3711  3712  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 850}_2 ∧ -b^{1, 850}_1 ∧ -b^{1, 850}_0 ∧ true) 
c  in CNF:
c    -b^{1, 850}_2 ∨  b^{1, 850}_1 ∨  b^{1, 850}_0 ∨ false 
c  in DIMACS:
-3710  3711  3712  0

c  3 does not represent an automaton state.
c    -(-b^{1, 850}_2 ∧  b^{1, 850}_1 ∧  b^{1, 850}_0 ∧ true) 
c  in CNF:
c     b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ false 
c  in DIMACS:
 3710 -3711 -3712  0
c  -3 does not represent an automaton state.
c    -( b^{1, 850}_2 ∧  b^{1, 850}_1 ∧  b^{1, 850}_0 ∧ true) 
c  in CNF:
c    -b^{1, 850}_2 ∨ -b^{1, 850}_1 ∨ -b^{1, 850}_0 ∨ false 
c  in DIMACS:
-3710 -3711 -3712  0

c i = 851
c  -2+1 --> -1
c    ( b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧  p_851) -> ( b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0)
c  in CNF:
c    -b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨  b^{1, 852}_2
c    -b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_1
c    -b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨  b^{1, 852}_0
c  in DIMACS:
-3713 -3714  3715 -851  3716 0
-3713 -3714  3715 -851 -3717 0
-3713 -3714  3715 -851  3718 0

c  -1+1 --> 0
c    ( b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0 ∧  p_851) -> (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧ -b^{1, 852}_0)
c  in CNF:
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_2
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_1
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_0
c  in DIMACS:
-3713  3714 -3715 -851 -3716 0
-3713  3714 -3715 -851 -3717 0
-3713  3714 -3715 -851 -3718 0

c  0+1 --> 1
c    (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧  p_851) -> (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0)
c  in CNF:
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_2
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_1
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨  b^{1, 852}_0
c  in DIMACS:
 3713  3714  3715 -851 -3716 0
 3713  3714  3715 -851 -3717 0
 3713  3714  3715 -851  3718 0

c  1+1 --> 2
c    (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0 ∧  p_851) -> (-b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0)
c  in CNF:
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_2
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨  b^{1, 852}_1
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ -p_851 ∨ -b^{1, 852}_0
c  in DIMACS:
 3713  3714 -3715 -851 -3716 0
 3713  3714 -3715 -851  3717 0
 3713  3714 -3715 -851 -3718 0

c  2+1 --> break 
c    (-b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧  p_851) -> break
c  in CNF:
c     b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ -p_851 ∨ break
c  in DIMACS:
 3713 -3714  3715 -851 1162 0


c  2-1 --> 1
c    (-b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧ -p_851) -> (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0)
c  in CNF:
c     b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_2
c     b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_1
c     b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨  b^{1, 852}_0
c  in DIMACS:
 3713 -3714  3715  851 -3716 0
 3713 -3714  3715  851 -3717 0
 3713 -3714  3715  851  3718 0

c  1-1 --> 0
c    (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0 ∧ -p_851) -> (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧ -b^{1, 852}_0)
c  in CNF:
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_2
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_1
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_0
c  in DIMACS:
 3713  3714 -3715  851 -3716 0
 3713  3714 -3715  851 -3717 0
 3713  3714 -3715  851 -3718 0

c  0-1 --> -1
c    (-b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧ -p_851) -> ( b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0)
c  in CNF:
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨  b^{1, 852}_2
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_1
c     b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨  b^{1, 852}_0
c  in DIMACS:
 3713  3714  3715  851  3716 0
 3713  3714  3715  851 -3717 0
 3713  3714  3715  851  3718 0

c  -1-1 --> -2
c    ( b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧  b^{1, 851}_0 ∧ -p_851) -> ( b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0)
c  in CNF:
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨  b^{1, 852}_2
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨  b^{1, 852}_1
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨  p_851 ∨ -b^{1, 852}_0
c  in DIMACS:
-3713  3714 -3715  851  3716 0
-3713  3714 -3715  851  3717 0
-3713  3714 -3715  851 -3718 0

c  -2-1 --> break 
c    ( b^{1, 851}_2 ∧  b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧ -p_851) -> break
c  in CNF:
c    -b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨  b^{1, 851}_0 ∨  p_851 ∨ break
c  in DIMACS:
-3713 -3714  3715  851 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 851}_2 ∧ -b^{1, 851}_1 ∧ -b^{1, 851}_0 ∧ true) 
c  in CNF:
c    -b^{1, 851}_2 ∨  b^{1, 851}_1 ∨  b^{1, 851}_0 ∨ false 
c  in DIMACS:
-3713  3714  3715  0

c  3 does not represent an automaton state.
c    -(-b^{1, 851}_2 ∧  b^{1, 851}_1 ∧  b^{1, 851}_0 ∧ true) 
c  in CNF:
c     b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ false 
c  in DIMACS:
 3713 -3714 -3715  0
c  -3 does not represent an automaton state.
c    -( b^{1, 851}_2 ∧  b^{1, 851}_1 ∧  b^{1, 851}_0 ∧ true) 
c  in CNF:
c    -b^{1, 851}_2 ∨ -b^{1, 851}_1 ∨ -b^{1, 851}_0 ∨ false 
c  in DIMACS:
-3713 -3714 -3715  0

c i = 852
c  -2+1 --> -1
c    ( b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧  p_852) -> ( b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0)
c  in CNF:
c    -b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨  b^{1, 853}_2
c    -b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_1
c    -b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨  b^{1, 853}_0
c  in DIMACS:
-3716 -3717  3718 -852  3719 0
-3716 -3717  3718 -852 -3720 0
-3716 -3717  3718 -852  3721 0

c  -1+1 --> 0
c    ( b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0 ∧  p_852) -> (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧ -b^{1, 853}_0)
c  in CNF:
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_2
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_1
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_0
c  in DIMACS:
-3716  3717 -3718 -852 -3719 0
-3716  3717 -3718 -852 -3720 0
-3716  3717 -3718 -852 -3721 0

c  0+1 --> 1
c    (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧  p_852) -> (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0)
c  in CNF:
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_2
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_1
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨  b^{1, 853}_0
c  in DIMACS:
 3716  3717  3718 -852 -3719 0
 3716  3717  3718 -852 -3720 0
 3716  3717  3718 -852  3721 0

c  1+1 --> 2
c    (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0 ∧  p_852) -> (-b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0)
c  in CNF:
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_2
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨  b^{1, 853}_1
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ -p_852 ∨ -b^{1, 853}_0
c  in DIMACS:
 3716  3717 -3718 -852 -3719 0
 3716  3717 -3718 -852  3720 0
 3716  3717 -3718 -852 -3721 0

c  2+1 --> break 
c    (-b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧  p_852) -> break
c  in CNF:
c     b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 3716 -3717  3718 -852 1162 0


c  2-1 --> 1
c    (-b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧ -p_852) -> (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0)
c  in CNF:
c     b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_2
c     b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_1
c     b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨  b^{1, 853}_0
c  in DIMACS:
 3716 -3717  3718  852 -3719 0
 3716 -3717  3718  852 -3720 0
 3716 -3717  3718  852  3721 0

c  1-1 --> 0
c    (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0 ∧ -p_852) -> (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧ -b^{1, 853}_0)
c  in CNF:
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_2
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_1
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_0
c  in DIMACS:
 3716  3717 -3718  852 -3719 0
 3716  3717 -3718  852 -3720 0
 3716  3717 -3718  852 -3721 0

c  0-1 --> -1
c    (-b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧ -p_852) -> ( b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0)
c  in CNF:
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨  b^{1, 853}_2
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_1
c     b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨  b^{1, 853}_0
c  in DIMACS:
 3716  3717  3718  852  3719 0
 3716  3717  3718  852 -3720 0
 3716  3717  3718  852  3721 0

c  -1-1 --> -2
c    ( b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧  b^{1, 852}_0 ∧ -p_852) -> ( b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0)
c  in CNF:
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨  b^{1, 853}_2
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨  b^{1, 853}_1
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨  p_852 ∨ -b^{1, 853}_0
c  in DIMACS:
-3716  3717 -3718  852  3719 0
-3716  3717 -3718  852  3720 0
-3716  3717 -3718  852 -3721 0

c  -2-1 --> break 
c    ( b^{1, 852}_2 ∧  b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨  b^{1, 852}_0 ∨  p_852 ∨ break
c  in DIMACS:
-3716 -3717  3718  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 852}_2 ∧ -b^{1, 852}_1 ∧ -b^{1, 852}_0 ∧ true) 
c  in CNF:
c    -b^{1, 852}_2 ∨  b^{1, 852}_1 ∨  b^{1, 852}_0 ∨ false 
c  in DIMACS:
-3716  3717  3718  0

c  3 does not represent an automaton state.
c    -(-b^{1, 852}_2 ∧  b^{1, 852}_1 ∧  b^{1, 852}_0 ∧ true) 
c  in CNF:
c     b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ false 
c  in DIMACS:
 3716 -3717 -3718  0
c  -3 does not represent an automaton state.
c    -( b^{1, 852}_2 ∧  b^{1, 852}_1 ∧  b^{1, 852}_0 ∧ true) 
c  in CNF:
c    -b^{1, 852}_2 ∨ -b^{1, 852}_1 ∨ -b^{1, 852}_0 ∨ false 
c  in DIMACS:
-3716 -3717 -3718  0

c i = 853
c  -2+1 --> -1
c    ( b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧  p_853) -> ( b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0)
c  in CNF:
c    -b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨  b^{1, 854}_2
c    -b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_1
c    -b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨  b^{1, 854}_0
c  in DIMACS:
-3719 -3720  3721 -853  3722 0
-3719 -3720  3721 -853 -3723 0
-3719 -3720  3721 -853  3724 0

c  -1+1 --> 0
c    ( b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0 ∧  p_853) -> (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧ -b^{1, 854}_0)
c  in CNF:
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_2
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_1
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_0
c  in DIMACS:
-3719  3720 -3721 -853 -3722 0
-3719  3720 -3721 -853 -3723 0
-3719  3720 -3721 -853 -3724 0

c  0+1 --> 1
c    (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧  p_853) -> (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0)
c  in CNF:
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_2
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_1
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨  b^{1, 854}_0
c  in DIMACS:
 3719  3720  3721 -853 -3722 0
 3719  3720  3721 -853 -3723 0
 3719  3720  3721 -853  3724 0

c  1+1 --> 2
c    (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0 ∧  p_853) -> (-b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0)
c  in CNF:
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_2
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨  b^{1, 854}_1
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ -p_853 ∨ -b^{1, 854}_0
c  in DIMACS:
 3719  3720 -3721 -853 -3722 0
 3719  3720 -3721 -853  3723 0
 3719  3720 -3721 -853 -3724 0

c  2+1 --> break 
c    (-b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧  p_853) -> break
c  in CNF:
c     b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ -p_853 ∨ break
c  in DIMACS:
 3719 -3720  3721 -853 1162 0


c  2-1 --> 1
c    (-b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧ -p_853) -> (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0)
c  in CNF:
c     b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_2
c     b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_1
c     b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨  b^{1, 854}_0
c  in DIMACS:
 3719 -3720  3721  853 -3722 0
 3719 -3720  3721  853 -3723 0
 3719 -3720  3721  853  3724 0

c  1-1 --> 0
c    (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0 ∧ -p_853) -> (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧ -b^{1, 854}_0)
c  in CNF:
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_2
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_1
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_0
c  in DIMACS:
 3719  3720 -3721  853 -3722 0
 3719  3720 -3721  853 -3723 0
 3719  3720 -3721  853 -3724 0

c  0-1 --> -1
c    (-b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧ -p_853) -> ( b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0)
c  in CNF:
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨  b^{1, 854}_2
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_1
c     b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨  b^{1, 854}_0
c  in DIMACS:
 3719  3720  3721  853  3722 0
 3719  3720  3721  853 -3723 0
 3719  3720  3721  853  3724 0

c  -1-1 --> -2
c    ( b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧  b^{1, 853}_0 ∧ -p_853) -> ( b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0)
c  in CNF:
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨  b^{1, 854}_2
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨  b^{1, 854}_1
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨  p_853 ∨ -b^{1, 854}_0
c  in DIMACS:
-3719  3720 -3721  853  3722 0
-3719  3720 -3721  853  3723 0
-3719  3720 -3721  853 -3724 0

c  -2-1 --> break 
c    ( b^{1, 853}_2 ∧  b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧ -p_853) -> break
c  in CNF:
c    -b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨  b^{1, 853}_0 ∨  p_853 ∨ break
c  in DIMACS:
-3719 -3720  3721  853 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 853}_2 ∧ -b^{1, 853}_1 ∧ -b^{1, 853}_0 ∧ true) 
c  in CNF:
c    -b^{1, 853}_2 ∨  b^{1, 853}_1 ∨  b^{1, 853}_0 ∨ false 
c  in DIMACS:
-3719  3720  3721  0

c  3 does not represent an automaton state.
c    -(-b^{1, 853}_2 ∧  b^{1, 853}_1 ∧  b^{1, 853}_0 ∧ true) 
c  in CNF:
c     b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ false 
c  in DIMACS:
 3719 -3720 -3721  0
c  -3 does not represent an automaton state.
c    -( b^{1, 853}_2 ∧  b^{1, 853}_1 ∧  b^{1, 853}_0 ∧ true) 
c  in CNF:
c    -b^{1, 853}_2 ∨ -b^{1, 853}_1 ∨ -b^{1, 853}_0 ∨ false 
c  in DIMACS:
-3719 -3720 -3721  0

c i = 854
c  -2+1 --> -1
c    ( b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧  p_854) -> ( b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0)
c  in CNF:
c    -b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨  b^{1, 855}_2
c    -b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_1
c    -b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨  b^{1, 855}_0
c  in DIMACS:
-3722 -3723  3724 -854  3725 0
-3722 -3723  3724 -854 -3726 0
-3722 -3723  3724 -854  3727 0

c  -1+1 --> 0
c    ( b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0 ∧  p_854) -> (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧ -b^{1, 855}_0)
c  in CNF:
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_2
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_1
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_0
c  in DIMACS:
-3722  3723 -3724 -854 -3725 0
-3722  3723 -3724 -854 -3726 0
-3722  3723 -3724 -854 -3727 0

c  0+1 --> 1
c    (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧  p_854) -> (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0)
c  in CNF:
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_2
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_1
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨  b^{1, 855}_0
c  in DIMACS:
 3722  3723  3724 -854 -3725 0
 3722  3723  3724 -854 -3726 0
 3722  3723  3724 -854  3727 0

c  1+1 --> 2
c    (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0 ∧  p_854) -> (-b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0)
c  in CNF:
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_2
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨  b^{1, 855}_1
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ -p_854 ∨ -b^{1, 855}_0
c  in DIMACS:
 3722  3723 -3724 -854 -3725 0
 3722  3723 -3724 -854  3726 0
 3722  3723 -3724 -854 -3727 0

c  2+1 --> break 
c    (-b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧  p_854) -> break
c  in CNF:
c     b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 3722 -3723  3724 -854 1162 0


c  2-1 --> 1
c    (-b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧ -p_854) -> (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0)
c  in CNF:
c     b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_2
c     b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_1
c     b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨  b^{1, 855}_0
c  in DIMACS:
 3722 -3723  3724  854 -3725 0
 3722 -3723  3724  854 -3726 0
 3722 -3723  3724  854  3727 0

c  1-1 --> 0
c    (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0 ∧ -p_854) -> (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧ -b^{1, 855}_0)
c  in CNF:
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_2
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_1
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_0
c  in DIMACS:
 3722  3723 -3724  854 -3725 0
 3722  3723 -3724  854 -3726 0
 3722  3723 -3724  854 -3727 0

c  0-1 --> -1
c    (-b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧ -p_854) -> ( b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0)
c  in CNF:
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨  b^{1, 855}_2
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_1
c     b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨  b^{1, 855}_0
c  in DIMACS:
 3722  3723  3724  854  3725 0
 3722  3723  3724  854 -3726 0
 3722  3723  3724  854  3727 0

c  -1-1 --> -2
c    ( b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧  b^{1, 854}_0 ∧ -p_854) -> ( b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0)
c  in CNF:
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨  b^{1, 855}_2
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨  b^{1, 855}_1
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨  p_854 ∨ -b^{1, 855}_0
c  in DIMACS:
-3722  3723 -3724  854  3725 0
-3722  3723 -3724  854  3726 0
-3722  3723 -3724  854 -3727 0

c  -2-1 --> break 
c    ( b^{1, 854}_2 ∧  b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨  b^{1, 854}_0 ∨  p_854 ∨ break
c  in DIMACS:
-3722 -3723  3724  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 854}_2 ∧ -b^{1, 854}_1 ∧ -b^{1, 854}_0 ∧ true) 
c  in CNF:
c    -b^{1, 854}_2 ∨  b^{1, 854}_1 ∨  b^{1, 854}_0 ∨ false 
c  in DIMACS:
-3722  3723  3724  0

c  3 does not represent an automaton state.
c    -(-b^{1, 854}_2 ∧  b^{1, 854}_1 ∧  b^{1, 854}_0 ∧ true) 
c  in CNF:
c     b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ false 
c  in DIMACS:
 3722 -3723 -3724  0
c  -3 does not represent an automaton state.
c    -( b^{1, 854}_2 ∧  b^{1, 854}_1 ∧  b^{1, 854}_0 ∧ true) 
c  in CNF:
c    -b^{1, 854}_2 ∨ -b^{1, 854}_1 ∨ -b^{1, 854}_0 ∨ false 
c  in DIMACS:
-3722 -3723 -3724  0

c i = 855
c  -2+1 --> -1
c    ( b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧  p_855) -> ( b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0)
c  in CNF:
c    -b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨  b^{1, 856}_2
c    -b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_1
c    -b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨  b^{1, 856}_0
c  in DIMACS:
-3725 -3726  3727 -855  3728 0
-3725 -3726  3727 -855 -3729 0
-3725 -3726  3727 -855  3730 0

c  -1+1 --> 0
c    ( b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0 ∧  p_855) -> (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧ -b^{1, 856}_0)
c  in CNF:
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_2
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_1
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_0
c  in DIMACS:
-3725  3726 -3727 -855 -3728 0
-3725  3726 -3727 -855 -3729 0
-3725  3726 -3727 -855 -3730 0

c  0+1 --> 1
c    (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧  p_855) -> (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0)
c  in CNF:
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_2
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_1
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨  b^{1, 856}_0
c  in DIMACS:
 3725  3726  3727 -855 -3728 0
 3725  3726  3727 -855 -3729 0
 3725  3726  3727 -855  3730 0

c  1+1 --> 2
c    (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0 ∧  p_855) -> (-b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0)
c  in CNF:
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_2
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨  b^{1, 856}_1
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ -p_855 ∨ -b^{1, 856}_0
c  in DIMACS:
 3725  3726 -3727 -855 -3728 0
 3725  3726 -3727 -855  3729 0
 3725  3726 -3727 -855 -3730 0

c  2+1 --> break 
c    (-b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧  p_855) -> break
c  in CNF:
c     b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 3725 -3726  3727 -855 1162 0


c  2-1 --> 1
c    (-b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧ -p_855) -> (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0)
c  in CNF:
c     b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_2
c     b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_1
c     b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨  b^{1, 856}_0
c  in DIMACS:
 3725 -3726  3727  855 -3728 0
 3725 -3726  3727  855 -3729 0
 3725 -3726  3727  855  3730 0

c  1-1 --> 0
c    (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0 ∧ -p_855) -> (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧ -b^{1, 856}_0)
c  in CNF:
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_2
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_1
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_0
c  in DIMACS:
 3725  3726 -3727  855 -3728 0
 3725  3726 -3727  855 -3729 0
 3725  3726 -3727  855 -3730 0

c  0-1 --> -1
c    (-b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧ -p_855) -> ( b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0)
c  in CNF:
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨  b^{1, 856}_2
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_1
c     b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨  b^{1, 856}_0
c  in DIMACS:
 3725  3726  3727  855  3728 0
 3725  3726  3727  855 -3729 0
 3725  3726  3727  855  3730 0

c  -1-1 --> -2
c    ( b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧  b^{1, 855}_0 ∧ -p_855) -> ( b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0)
c  in CNF:
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨  b^{1, 856}_2
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨  b^{1, 856}_1
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨  p_855 ∨ -b^{1, 856}_0
c  in DIMACS:
-3725  3726 -3727  855  3728 0
-3725  3726 -3727  855  3729 0
-3725  3726 -3727  855 -3730 0

c  -2-1 --> break 
c    ( b^{1, 855}_2 ∧  b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨  b^{1, 855}_0 ∨  p_855 ∨ break
c  in DIMACS:
-3725 -3726  3727  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 855}_2 ∧ -b^{1, 855}_1 ∧ -b^{1, 855}_0 ∧ true) 
c  in CNF:
c    -b^{1, 855}_2 ∨  b^{1, 855}_1 ∨  b^{1, 855}_0 ∨ false 
c  in DIMACS:
-3725  3726  3727  0

c  3 does not represent an automaton state.
c    -(-b^{1, 855}_2 ∧  b^{1, 855}_1 ∧  b^{1, 855}_0 ∧ true) 
c  in CNF:
c     b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ false 
c  in DIMACS:
 3725 -3726 -3727  0
c  -3 does not represent an automaton state.
c    -( b^{1, 855}_2 ∧  b^{1, 855}_1 ∧  b^{1, 855}_0 ∧ true) 
c  in CNF:
c    -b^{1, 855}_2 ∨ -b^{1, 855}_1 ∨ -b^{1, 855}_0 ∨ false 
c  in DIMACS:
-3725 -3726 -3727  0

c i = 856
c  -2+1 --> -1
c    ( b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧  p_856) -> ( b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0)
c  in CNF:
c    -b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨  b^{1, 857}_2
c    -b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_1
c    -b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨  b^{1, 857}_0
c  in DIMACS:
-3728 -3729  3730 -856  3731 0
-3728 -3729  3730 -856 -3732 0
-3728 -3729  3730 -856  3733 0

c  -1+1 --> 0
c    ( b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0 ∧  p_856) -> (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧ -b^{1, 857}_0)
c  in CNF:
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_2
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_1
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_0
c  in DIMACS:
-3728  3729 -3730 -856 -3731 0
-3728  3729 -3730 -856 -3732 0
-3728  3729 -3730 -856 -3733 0

c  0+1 --> 1
c    (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧  p_856) -> (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0)
c  in CNF:
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_2
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_1
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨  b^{1, 857}_0
c  in DIMACS:
 3728  3729  3730 -856 -3731 0
 3728  3729  3730 -856 -3732 0
 3728  3729  3730 -856  3733 0

c  1+1 --> 2
c    (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0 ∧  p_856) -> (-b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0)
c  in CNF:
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_2
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨  b^{1, 857}_1
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ -p_856 ∨ -b^{1, 857}_0
c  in DIMACS:
 3728  3729 -3730 -856 -3731 0
 3728  3729 -3730 -856  3732 0
 3728  3729 -3730 -856 -3733 0

c  2+1 --> break 
c    (-b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧  p_856) -> break
c  in CNF:
c     b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 3728 -3729  3730 -856 1162 0


c  2-1 --> 1
c    (-b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧ -p_856) -> (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0)
c  in CNF:
c     b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_2
c     b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_1
c     b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨  b^{1, 857}_0
c  in DIMACS:
 3728 -3729  3730  856 -3731 0
 3728 -3729  3730  856 -3732 0
 3728 -3729  3730  856  3733 0

c  1-1 --> 0
c    (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0 ∧ -p_856) -> (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧ -b^{1, 857}_0)
c  in CNF:
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_2
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_1
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_0
c  in DIMACS:
 3728  3729 -3730  856 -3731 0
 3728  3729 -3730  856 -3732 0
 3728  3729 -3730  856 -3733 0

c  0-1 --> -1
c    (-b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧ -p_856) -> ( b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0)
c  in CNF:
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨  b^{1, 857}_2
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_1
c     b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨  b^{1, 857}_0
c  in DIMACS:
 3728  3729  3730  856  3731 0
 3728  3729  3730  856 -3732 0
 3728  3729  3730  856  3733 0

c  -1-1 --> -2
c    ( b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧  b^{1, 856}_0 ∧ -p_856) -> ( b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0)
c  in CNF:
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨  b^{1, 857}_2
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨  b^{1, 857}_1
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨  p_856 ∨ -b^{1, 857}_0
c  in DIMACS:
-3728  3729 -3730  856  3731 0
-3728  3729 -3730  856  3732 0
-3728  3729 -3730  856 -3733 0

c  -2-1 --> break 
c    ( b^{1, 856}_2 ∧  b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨  b^{1, 856}_0 ∨  p_856 ∨ break
c  in DIMACS:
-3728 -3729  3730  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 856}_2 ∧ -b^{1, 856}_1 ∧ -b^{1, 856}_0 ∧ true) 
c  in CNF:
c    -b^{1, 856}_2 ∨  b^{1, 856}_1 ∨  b^{1, 856}_0 ∨ false 
c  in DIMACS:
-3728  3729  3730  0

c  3 does not represent an automaton state.
c    -(-b^{1, 856}_2 ∧  b^{1, 856}_1 ∧  b^{1, 856}_0 ∧ true) 
c  in CNF:
c     b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ false 
c  in DIMACS:
 3728 -3729 -3730  0
c  -3 does not represent an automaton state.
c    -( b^{1, 856}_2 ∧  b^{1, 856}_1 ∧  b^{1, 856}_0 ∧ true) 
c  in CNF:
c    -b^{1, 856}_2 ∨ -b^{1, 856}_1 ∨ -b^{1, 856}_0 ∨ false 
c  in DIMACS:
-3728 -3729 -3730  0

c i = 857
c  -2+1 --> -1
c    ( b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧  p_857) -> ( b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0)
c  in CNF:
c    -b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨  b^{1, 858}_2
c    -b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_1
c    -b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨  b^{1, 858}_0
c  in DIMACS:
-3731 -3732  3733 -857  3734 0
-3731 -3732  3733 -857 -3735 0
-3731 -3732  3733 -857  3736 0

c  -1+1 --> 0
c    ( b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0 ∧  p_857) -> (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧ -b^{1, 858}_0)
c  in CNF:
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_2
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_1
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_0
c  in DIMACS:
-3731  3732 -3733 -857 -3734 0
-3731  3732 -3733 -857 -3735 0
-3731  3732 -3733 -857 -3736 0

c  0+1 --> 1
c    (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧  p_857) -> (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0)
c  in CNF:
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_2
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_1
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨  b^{1, 858}_0
c  in DIMACS:
 3731  3732  3733 -857 -3734 0
 3731  3732  3733 -857 -3735 0
 3731  3732  3733 -857  3736 0

c  1+1 --> 2
c    (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0 ∧  p_857) -> (-b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0)
c  in CNF:
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_2
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨  b^{1, 858}_1
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ -p_857 ∨ -b^{1, 858}_0
c  in DIMACS:
 3731  3732 -3733 -857 -3734 0
 3731  3732 -3733 -857  3735 0
 3731  3732 -3733 -857 -3736 0

c  2+1 --> break 
c    (-b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧  p_857) -> break
c  in CNF:
c     b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ -p_857 ∨ break
c  in DIMACS:
 3731 -3732  3733 -857 1162 0


c  2-1 --> 1
c    (-b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧ -p_857) -> (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0)
c  in CNF:
c     b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_2
c     b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_1
c     b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨  b^{1, 858}_0
c  in DIMACS:
 3731 -3732  3733  857 -3734 0
 3731 -3732  3733  857 -3735 0
 3731 -3732  3733  857  3736 0

c  1-1 --> 0
c    (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0 ∧ -p_857) -> (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧ -b^{1, 858}_0)
c  in CNF:
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_2
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_1
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_0
c  in DIMACS:
 3731  3732 -3733  857 -3734 0
 3731  3732 -3733  857 -3735 0
 3731  3732 -3733  857 -3736 0

c  0-1 --> -1
c    (-b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧ -p_857) -> ( b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0)
c  in CNF:
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨  b^{1, 858}_2
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_1
c     b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨  b^{1, 858}_0
c  in DIMACS:
 3731  3732  3733  857  3734 0
 3731  3732  3733  857 -3735 0
 3731  3732  3733  857  3736 0

c  -1-1 --> -2
c    ( b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧  b^{1, 857}_0 ∧ -p_857) -> ( b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0)
c  in CNF:
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨  b^{1, 858}_2
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨  b^{1, 858}_1
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨  p_857 ∨ -b^{1, 858}_0
c  in DIMACS:
-3731  3732 -3733  857  3734 0
-3731  3732 -3733  857  3735 0
-3731  3732 -3733  857 -3736 0

c  -2-1 --> break 
c    ( b^{1, 857}_2 ∧  b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧ -p_857) -> break
c  in CNF:
c    -b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨  b^{1, 857}_0 ∨  p_857 ∨ break
c  in DIMACS:
-3731 -3732  3733  857 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 857}_2 ∧ -b^{1, 857}_1 ∧ -b^{1, 857}_0 ∧ true) 
c  in CNF:
c    -b^{1, 857}_2 ∨  b^{1, 857}_1 ∨  b^{1, 857}_0 ∨ false 
c  in DIMACS:
-3731  3732  3733  0

c  3 does not represent an automaton state.
c    -(-b^{1, 857}_2 ∧  b^{1, 857}_1 ∧  b^{1, 857}_0 ∧ true) 
c  in CNF:
c     b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ false 
c  in DIMACS:
 3731 -3732 -3733  0
c  -3 does not represent an automaton state.
c    -( b^{1, 857}_2 ∧  b^{1, 857}_1 ∧  b^{1, 857}_0 ∧ true) 
c  in CNF:
c    -b^{1, 857}_2 ∨ -b^{1, 857}_1 ∨ -b^{1, 857}_0 ∨ false 
c  in DIMACS:
-3731 -3732 -3733  0

c i = 858
c  -2+1 --> -1
c    ( b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧  p_858) -> ( b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0)
c  in CNF:
c    -b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨  b^{1, 859}_2
c    -b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_1
c    -b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨  b^{1, 859}_0
c  in DIMACS:
-3734 -3735  3736 -858  3737 0
-3734 -3735  3736 -858 -3738 0
-3734 -3735  3736 -858  3739 0

c  -1+1 --> 0
c    ( b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0 ∧  p_858) -> (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧ -b^{1, 859}_0)
c  in CNF:
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_2
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_1
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_0
c  in DIMACS:
-3734  3735 -3736 -858 -3737 0
-3734  3735 -3736 -858 -3738 0
-3734  3735 -3736 -858 -3739 0

c  0+1 --> 1
c    (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧  p_858) -> (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0)
c  in CNF:
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_2
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_1
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨  b^{1, 859}_0
c  in DIMACS:
 3734  3735  3736 -858 -3737 0
 3734  3735  3736 -858 -3738 0
 3734  3735  3736 -858  3739 0

c  1+1 --> 2
c    (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0 ∧  p_858) -> (-b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0)
c  in CNF:
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_2
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨  b^{1, 859}_1
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ -p_858 ∨ -b^{1, 859}_0
c  in DIMACS:
 3734  3735 -3736 -858 -3737 0
 3734  3735 -3736 -858  3738 0
 3734  3735 -3736 -858 -3739 0

c  2+1 --> break 
c    (-b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧  p_858) -> break
c  in CNF:
c     b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 3734 -3735  3736 -858 1162 0


c  2-1 --> 1
c    (-b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧ -p_858) -> (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0)
c  in CNF:
c     b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_2
c     b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_1
c     b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨  b^{1, 859}_0
c  in DIMACS:
 3734 -3735  3736  858 -3737 0
 3734 -3735  3736  858 -3738 0
 3734 -3735  3736  858  3739 0

c  1-1 --> 0
c    (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0 ∧ -p_858) -> (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧ -b^{1, 859}_0)
c  in CNF:
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_2
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_1
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_0
c  in DIMACS:
 3734  3735 -3736  858 -3737 0
 3734  3735 -3736  858 -3738 0
 3734  3735 -3736  858 -3739 0

c  0-1 --> -1
c    (-b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧ -p_858) -> ( b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0)
c  in CNF:
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨  b^{1, 859}_2
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_1
c     b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨  b^{1, 859}_0
c  in DIMACS:
 3734  3735  3736  858  3737 0
 3734  3735  3736  858 -3738 0
 3734  3735  3736  858  3739 0

c  -1-1 --> -2
c    ( b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧  b^{1, 858}_0 ∧ -p_858) -> ( b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0)
c  in CNF:
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨  b^{1, 859}_2
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨  b^{1, 859}_1
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨  p_858 ∨ -b^{1, 859}_0
c  in DIMACS:
-3734  3735 -3736  858  3737 0
-3734  3735 -3736  858  3738 0
-3734  3735 -3736  858 -3739 0

c  -2-1 --> break 
c    ( b^{1, 858}_2 ∧  b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨  b^{1, 858}_0 ∨  p_858 ∨ break
c  in DIMACS:
-3734 -3735  3736  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 858}_2 ∧ -b^{1, 858}_1 ∧ -b^{1, 858}_0 ∧ true) 
c  in CNF:
c    -b^{1, 858}_2 ∨  b^{1, 858}_1 ∨  b^{1, 858}_0 ∨ false 
c  in DIMACS:
-3734  3735  3736  0

c  3 does not represent an automaton state.
c    -(-b^{1, 858}_2 ∧  b^{1, 858}_1 ∧  b^{1, 858}_0 ∧ true) 
c  in CNF:
c     b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ false 
c  in DIMACS:
 3734 -3735 -3736  0
c  -3 does not represent an automaton state.
c    -( b^{1, 858}_2 ∧  b^{1, 858}_1 ∧  b^{1, 858}_0 ∧ true) 
c  in CNF:
c    -b^{1, 858}_2 ∨ -b^{1, 858}_1 ∨ -b^{1, 858}_0 ∨ false 
c  in DIMACS:
-3734 -3735 -3736  0

c i = 859
c  -2+1 --> -1
c    ( b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧  p_859) -> ( b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0)
c  in CNF:
c    -b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨  b^{1, 860}_2
c    -b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_1
c    -b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨  b^{1, 860}_0
c  in DIMACS:
-3737 -3738  3739 -859  3740 0
-3737 -3738  3739 -859 -3741 0
-3737 -3738  3739 -859  3742 0

c  -1+1 --> 0
c    ( b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0 ∧  p_859) -> (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧ -b^{1, 860}_0)
c  in CNF:
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_2
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_1
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_0
c  in DIMACS:
-3737  3738 -3739 -859 -3740 0
-3737  3738 -3739 -859 -3741 0
-3737  3738 -3739 -859 -3742 0

c  0+1 --> 1
c    (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧  p_859) -> (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0)
c  in CNF:
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_2
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_1
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨  b^{1, 860}_0
c  in DIMACS:
 3737  3738  3739 -859 -3740 0
 3737  3738  3739 -859 -3741 0
 3737  3738  3739 -859  3742 0

c  1+1 --> 2
c    (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0 ∧  p_859) -> (-b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0)
c  in CNF:
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_2
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨  b^{1, 860}_1
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ -p_859 ∨ -b^{1, 860}_0
c  in DIMACS:
 3737  3738 -3739 -859 -3740 0
 3737  3738 -3739 -859  3741 0
 3737  3738 -3739 -859 -3742 0

c  2+1 --> break 
c    (-b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧  p_859) -> break
c  in CNF:
c     b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ -p_859 ∨ break
c  in DIMACS:
 3737 -3738  3739 -859 1162 0


c  2-1 --> 1
c    (-b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧ -p_859) -> (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0)
c  in CNF:
c     b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_2
c     b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_1
c     b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨  b^{1, 860}_0
c  in DIMACS:
 3737 -3738  3739  859 -3740 0
 3737 -3738  3739  859 -3741 0
 3737 -3738  3739  859  3742 0

c  1-1 --> 0
c    (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0 ∧ -p_859) -> (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧ -b^{1, 860}_0)
c  in CNF:
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_2
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_1
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_0
c  in DIMACS:
 3737  3738 -3739  859 -3740 0
 3737  3738 -3739  859 -3741 0
 3737  3738 -3739  859 -3742 0

c  0-1 --> -1
c    (-b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧ -p_859) -> ( b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0)
c  in CNF:
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨  b^{1, 860}_2
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_1
c     b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨  b^{1, 860}_0
c  in DIMACS:
 3737  3738  3739  859  3740 0
 3737  3738  3739  859 -3741 0
 3737  3738  3739  859  3742 0

c  -1-1 --> -2
c    ( b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧  b^{1, 859}_0 ∧ -p_859) -> ( b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0)
c  in CNF:
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨  b^{1, 860}_2
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨  b^{1, 860}_1
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨  p_859 ∨ -b^{1, 860}_0
c  in DIMACS:
-3737  3738 -3739  859  3740 0
-3737  3738 -3739  859  3741 0
-3737  3738 -3739  859 -3742 0

c  -2-1 --> break 
c    ( b^{1, 859}_2 ∧  b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧ -p_859) -> break
c  in CNF:
c    -b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨  b^{1, 859}_0 ∨  p_859 ∨ break
c  in DIMACS:
-3737 -3738  3739  859 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 859}_2 ∧ -b^{1, 859}_1 ∧ -b^{1, 859}_0 ∧ true) 
c  in CNF:
c    -b^{1, 859}_2 ∨  b^{1, 859}_1 ∨  b^{1, 859}_0 ∨ false 
c  in DIMACS:
-3737  3738  3739  0

c  3 does not represent an automaton state.
c    -(-b^{1, 859}_2 ∧  b^{1, 859}_1 ∧  b^{1, 859}_0 ∧ true) 
c  in CNF:
c     b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ false 
c  in DIMACS:
 3737 -3738 -3739  0
c  -3 does not represent an automaton state.
c    -( b^{1, 859}_2 ∧  b^{1, 859}_1 ∧  b^{1, 859}_0 ∧ true) 
c  in CNF:
c    -b^{1, 859}_2 ∨ -b^{1, 859}_1 ∨ -b^{1, 859}_0 ∨ false 
c  in DIMACS:
-3737 -3738 -3739  0

c i = 860
c  -2+1 --> -1
c    ( b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧  p_860) -> ( b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0)
c  in CNF:
c    -b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨  b^{1, 861}_2
c    -b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_1
c    -b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨  b^{1, 861}_0
c  in DIMACS:
-3740 -3741  3742 -860  3743 0
-3740 -3741  3742 -860 -3744 0
-3740 -3741  3742 -860  3745 0

c  -1+1 --> 0
c    ( b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0 ∧  p_860) -> (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧ -b^{1, 861}_0)
c  in CNF:
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_2
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_1
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_0
c  in DIMACS:
-3740  3741 -3742 -860 -3743 0
-3740  3741 -3742 -860 -3744 0
-3740  3741 -3742 -860 -3745 0

c  0+1 --> 1
c    (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧  p_860) -> (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0)
c  in CNF:
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_2
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_1
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨  b^{1, 861}_0
c  in DIMACS:
 3740  3741  3742 -860 -3743 0
 3740  3741  3742 -860 -3744 0
 3740  3741  3742 -860  3745 0

c  1+1 --> 2
c    (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0 ∧  p_860) -> (-b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0)
c  in CNF:
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_2
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨  b^{1, 861}_1
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ -p_860 ∨ -b^{1, 861}_0
c  in DIMACS:
 3740  3741 -3742 -860 -3743 0
 3740  3741 -3742 -860  3744 0
 3740  3741 -3742 -860 -3745 0

c  2+1 --> break 
c    (-b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧  p_860) -> break
c  in CNF:
c     b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 3740 -3741  3742 -860 1162 0


c  2-1 --> 1
c    (-b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧ -p_860) -> (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0)
c  in CNF:
c     b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_2
c     b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_1
c     b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨  b^{1, 861}_0
c  in DIMACS:
 3740 -3741  3742  860 -3743 0
 3740 -3741  3742  860 -3744 0
 3740 -3741  3742  860  3745 0

c  1-1 --> 0
c    (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0 ∧ -p_860) -> (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧ -b^{1, 861}_0)
c  in CNF:
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_2
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_1
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_0
c  in DIMACS:
 3740  3741 -3742  860 -3743 0
 3740  3741 -3742  860 -3744 0
 3740  3741 -3742  860 -3745 0

c  0-1 --> -1
c    (-b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧ -p_860) -> ( b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0)
c  in CNF:
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨  b^{1, 861}_2
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_1
c     b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨  b^{1, 861}_0
c  in DIMACS:
 3740  3741  3742  860  3743 0
 3740  3741  3742  860 -3744 0
 3740  3741  3742  860  3745 0

c  -1-1 --> -2
c    ( b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧  b^{1, 860}_0 ∧ -p_860) -> ( b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0)
c  in CNF:
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨  b^{1, 861}_2
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨  b^{1, 861}_1
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨  p_860 ∨ -b^{1, 861}_0
c  in DIMACS:
-3740  3741 -3742  860  3743 0
-3740  3741 -3742  860  3744 0
-3740  3741 -3742  860 -3745 0

c  -2-1 --> break 
c    ( b^{1, 860}_2 ∧  b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨  b^{1, 860}_0 ∨  p_860 ∨ break
c  in DIMACS:
-3740 -3741  3742  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 860}_2 ∧ -b^{1, 860}_1 ∧ -b^{1, 860}_0 ∧ true) 
c  in CNF:
c    -b^{1, 860}_2 ∨  b^{1, 860}_1 ∨  b^{1, 860}_0 ∨ false 
c  in DIMACS:
-3740  3741  3742  0

c  3 does not represent an automaton state.
c    -(-b^{1, 860}_2 ∧  b^{1, 860}_1 ∧  b^{1, 860}_0 ∧ true) 
c  in CNF:
c     b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ false 
c  in DIMACS:
 3740 -3741 -3742  0
c  -3 does not represent an automaton state.
c    -( b^{1, 860}_2 ∧  b^{1, 860}_1 ∧  b^{1, 860}_0 ∧ true) 
c  in CNF:
c    -b^{1, 860}_2 ∨ -b^{1, 860}_1 ∨ -b^{1, 860}_0 ∨ false 
c  in DIMACS:
-3740 -3741 -3742  0

c i = 861
c  -2+1 --> -1
c    ( b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧  p_861) -> ( b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0)
c  in CNF:
c    -b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨  b^{1, 862}_2
c    -b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_1
c    -b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨  b^{1, 862}_0
c  in DIMACS:
-3743 -3744  3745 -861  3746 0
-3743 -3744  3745 -861 -3747 0
-3743 -3744  3745 -861  3748 0

c  -1+1 --> 0
c    ( b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0 ∧  p_861) -> (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧ -b^{1, 862}_0)
c  in CNF:
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_2
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_1
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_0
c  in DIMACS:
-3743  3744 -3745 -861 -3746 0
-3743  3744 -3745 -861 -3747 0
-3743  3744 -3745 -861 -3748 0

c  0+1 --> 1
c    (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧  p_861) -> (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0)
c  in CNF:
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_2
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_1
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨  b^{1, 862}_0
c  in DIMACS:
 3743  3744  3745 -861 -3746 0
 3743  3744  3745 -861 -3747 0
 3743  3744  3745 -861  3748 0

c  1+1 --> 2
c    (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0 ∧  p_861) -> (-b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0)
c  in CNF:
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_2
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨  b^{1, 862}_1
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ -p_861 ∨ -b^{1, 862}_0
c  in DIMACS:
 3743  3744 -3745 -861 -3746 0
 3743  3744 -3745 -861  3747 0
 3743  3744 -3745 -861 -3748 0

c  2+1 --> break 
c    (-b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧  p_861) -> break
c  in CNF:
c     b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 3743 -3744  3745 -861 1162 0


c  2-1 --> 1
c    (-b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧ -p_861) -> (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0)
c  in CNF:
c     b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_2
c     b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_1
c     b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨  b^{1, 862}_0
c  in DIMACS:
 3743 -3744  3745  861 -3746 0
 3743 -3744  3745  861 -3747 0
 3743 -3744  3745  861  3748 0

c  1-1 --> 0
c    (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0 ∧ -p_861) -> (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧ -b^{1, 862}_0)
c  in CNF:
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_2
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_1
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_0
c  in DIMACS:
 3743  3744 -3745  861 -3746 0
 3743  3744 -3745  861 -3747 0
 3743  3744 -3745  861 -3748 0

c  0-1 --> -1
c    (-b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧ -p_861) -> ( b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0)
c  in CNF:
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨  b^{1, 862}_2
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_1
c     b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨  b^{1, 862}_0
c  in DIMACS:
 3743  3744  3745  861  3746 0
 3743  3744  3745  861 -3747 0
 3743  3744  3745  861  3748 0

c  -1-1 --> -2
c    ( b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧  b^{1, 861}_0 ∧ -p_861) -> ( b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0)
c  in CNF:
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨  b^{1, 862}_2
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨  b^{1, 862}_1
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨  p_861 ∨ -b^{1, 862}_0
c  in DIMACS:
-3743  3744 -3745  861  3746 0
-3743  3744 -3745  861  3747 0
-3743  3744 -3745  861 -3748 0

c  -2-1 --> break 
c    ( b^{1, 861}_2 ∧  b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨  b^{1, 861}_0 ∨  p_861 ∨ break
c  in DIMACS:
-3743 -3744  3745  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 861}_2 ∧ -b^{1, 861}_1 ∧ -b^{1, 861}_0 ∧ true) 
c  in CNF:
c    -b^{1, 861}_2 ∨  b^{1, 861}_1 ∨  b^{1, 861}_0 ∨ false 
c  in DIMACS:
-3743  3744  3745  0

c  3 does not represent an automaton state.
c    -(-b^{1, 861}_2 ∧  b^{1, 861}_1 ∧  b^{1, 861}_0 ∧ true) 
c  in CNF:
c     b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ false 
c  in DIMACS:
 3743 -3744 -3745  0
c  -3 does not represent an automaton state.
c    -( b^{1, 861}_2 ∧  b^{1, 861}_1 ∧  b^{1, 861}_0 ∧ true) 
c  in CNF:
c    -b^{1, 861}_2 ∨ -b^{1, 861}_1 ∨ -b^{1, 861}_0 ∨ false 
c  in DIMACS:
-3743 -3744 -3745  0

c i = 862
c  -2+1 --> -1
c    ( b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧  p_862) -> ( b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0)
c  in CNF:
c    -b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨  b^{1, 863}_2
c    -b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_1
c    -b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨  b^{1, 863}_0
c  in DIMACS:
-3746 -3747  3748 -862  3749 0
-3746 -3747  3748 -862 -3750 0
-3746 -3747  3748 -862  3751 0

c  -1+1 --> 0
c    ( b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0 ∧  p_862) -> (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧ -b^{1, 863}_0)
c  in CNF:
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_2
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_1
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_0
c  in DIMACS:
-3746  3747 -3748 -862 -3749 0
-3746  3747 -3748 -862 -3750 0
-3746  3747 -3748 -862 -3751 0

c  0+1 --> 1
c    (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧  p_862) -> (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0)
c  in CNF:
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_2
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_1
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨  b^{1, 863}_0
c  in DIMACS:
 3746  3747  3748 -862 -3749 0
 3746  3747  3748 -862 -3750 0
 3746  3747  3748 -862  3751 0

c  1+1 --> 2
c    (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0 ∧  p_862) -> (-b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0)
c  in CNF:
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_2
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨  b^{1, 863}_1
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ -p_862 ∨ -b^{1, 863}_0
c  in DIMACS:
 3746  3747 -3748 -862 -3749 0
 3746  3747 -3748 -862  3750 0
 3746  3747 -3748 -862 -3751 0

c  2+1 --> break 
c    (-b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧  p_862) -> break
c  in CNF:
c     b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ -p_862 ∨ break
c  in DIMACS:
 3746 -3747  3748 -862 1162 0


c  2-1 --> 1
c    (-b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧ -p_862) -> (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0)
c  in CNF:
c     b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_2
c     b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_1
c     b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨  b^{1, 863}_0
c  in DIMACS:
 3746 -3747  3748  862 -3749 0
 3746 -3747  3748  862 -3750 0
 3746 -3747  3748  862  3751 0

c  1-1 --> 0
c    (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0 ∧ -p_862) -> (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧ -b^{1, 863}_0)
c  in CNF:
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_2
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_1
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_0
c  in DIMACS:
 3746  3747 -3748  862 -3749 0
 3746  3747 -3748  862 -3750 0
 3746  3747 -3748  862 -3751 0

c  0-1 --> -1
c    (-b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧ -p_862) -> ( b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0)
c  in CNF:
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨  b^{1, 863}_2
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_1
c     b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨  b^{1, 863}_0
c  in DIMACS:
 3746  3747  3748  862  3749 0
 3746  3747  3748  862 -3750 0
 3746  3747  3748  862  3751 0

c  -1-1 --> -2
c    ( b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧  b^{1, 862}_0 ∧ -p_862) -> ( b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0)
c  in CNF:
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨  b^{1, 863}_2
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨  b^{1, 863}_1
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨  p_862 ∨ -b^{1, 863}_0
c  in DIMACS:
-3746  3747 -3748  862  3749 0
-3746  3747 -3748  862  3750 0
-3746  3747 -3748  862 -3751 0

c  -2-1 --> break 
c    ( b^{1, 862}_2 ∧  b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧ -p_862) -> break
c  in CNF:
c    -b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨  b^{1, 862}_0 ∨  p_862 ∨ break
c  in DIMACS:
-3746 -3747  3748  862 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 862}_2 ∧ -b^{1, 862}_1 ∧ -b^{1, 862}_0 ∧ true) 
c  in CNF:
c    -b^{1, 862}_2 ∨  b^{1, 862}_1 ∨  b^{1, 862}_0 ∨ false 
c  in DIMACS:
-3746  3747  3748  0

c  3 does not represent an automaton state.
c    -(-b^{1, 862}_2 ∧  b^{1, 862}_1 ∧  b^{1, 862}_0 ∧ true) 
c  in CNF:
c     b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ false 
c  in DIMACS:
 3746 -3747 -3748  0
c  -3 does not represent an automaton state.
c    -( b^{1, 862}_2 ∧  b^{1, 862}_1 ∧  b^{1, 862}_0 ∧ true) 
c  in CNF:
c    -b^{1, 862}_2 ∨ -b^{1, 862}_1 ∨ -b^{1, 862}_0 ∨ false 
c  in DIMACS:
-3746 -3747 -3748  0

c i = 863
c  -2+1 --> -1
c    ( b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧  p_863) -> ( b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0)
c  in CNF:
c    -b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨  b^{1, 864}_2
c    -b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_1
c    -b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨  b^{1, 864}_0
c  in DIMACS:
-3749 -3750  3751 -863  3752 0
-3749 -3750  3751 -863 -3753 0
-3749 -3750  3751 -863  3754 0

c  -1+1 --> 0
c    ( b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0 ∧  p_863) -> (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧ -b^{1, 864}_0)
c  in CNF:
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_2
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_1
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_0
c  in DIMACS:
-3749  3750 -3751 -863 -3752 0
-3749  3750 -3751 -863 -3753 0
-3749  3750 -3751 -863 -3754 0

c  0+1 --> 1
c    (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧  p_863) -> (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0)
c  in CNF:
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_2
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_1
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨  b^{1, 864}_0
c  in DIMACS:
 3749  3750  3751 -863 -3752 0
 3749  3750  3751 -863 -3753 0
 3749  3750  3751 -863  3754 0

c  1+1 --> 2
c    (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0 ∧  p_863) -> (-b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0)
c  in CNF:
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_2
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨  b^{1, 864}_1
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ -p_863 ∨ -b^{1, 864}_0
c  in DIMACS:
 3749  3750 -3751 -863 -3752 0
 3749  3750 -3751 -863  3753 0
 3749  3750 -3751 -863 -3754 0

c  2+1 --> break 
c    (-b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧  p_863) -> break
c  in CNF:
c     b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ -p_863 ∨ break
c  in DIMACS:
 3749 -3750  3751 -863 1162 0


c  2-1 --> 1
c    (-b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧ -p_863) -> (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0)
c  in CNF:
c     b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_2
c     b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_1
c     b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨  b^{1, 864}_0
c  in DIMACS:
 3749 -3750  3751  863 -3752 0
 3749 -3750  3751  863 -3753 0
 3749 -3750  3751  863  3754 0

c  1-1 --> 0
c    (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0 ∧ -p_863) -> (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧ -b^{1, 864}_0)
c  in CNF:
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_2
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_1
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_0
c  in DIMACS:
 3749  3750 -3751  863 -3752 0
 3749  3750 -3751  863 -3753 0
 3749  3750 -3751  863 -3754 0

c  0-1 --> -1
c    (-b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧ -p_863) -> ( b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0)
c  in CNF:
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨  b^{1, 864}_2
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_1
c     b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨  b^{1, 864}_0
c  in DIMACS:
 3749  3750  3751  863  3752 0
 3749  3750  3751  863 -3753 0
 3749  3750  3751  863  3754 0

c  -1-1 --> -2
c    ( b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧  b^{1, 863}_0 ∧ -p_863) -> ( b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0)
c  in CNF:
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨  b^{1, 864}_2
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨  b^{1, 864}_1
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨  p_863 ∨ -b^{1, 864}_0
c  in DIMACS:
-3749  3750 -3751  863  3752 0
-3749  3750 -3751  863  3753 0
-3749  3750 -3751  863 -3754 0

c  -2-1 --> break 
c    ( b^{1, 863}_2 ∧  b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧ -p_863) -> break
c  in CNF:
c    -b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨  b^{1, 863}_0 ∨  p_863 ∨ break
c  in DIMACS:
-3749 -3750  3751  863 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 863}_2 ∧ -b^{1, 863}_1 ∧ -b^{1, 863}_0 ∧ true) 
c  in CNF:
c    -b^{1, 863}_2 ∨  b^{1, 863}_1 ∨  b^{1, 863}_0 ∨ false 
c  in DIMACS:
-3749  3750  3751  0

c  3 does not represent an automaton state.
c    -(-b^{1, 863}_2 ∧  b^{1, 863}_1 ∧  b^{1, 863}_0 ∧ true) 
c  in CNF:
c     b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ false 
c  in DIMACS:
 3749 -3750 -3751  0
c  -3 does not represent an automaton state.
c    -( b^{1, 863}_2 ∧  b^{1, 863}_1 ∧  b^{1, 863}_0 ∧ true) 
c  in CNF:
c    -b^{1, 863}_2 ∨ -b^{1, 863}_1 ∨ -b^{1, 863}_0 ∨ false 
c  in DIMACS:
-3749 -3750 -3751  0

c i = 864
c  -2+1 --> -1
c    ( b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧  p_864) -> ( b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0)
c  in CNF:
c    -b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨  b^{1, 865}_2
c    -b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_1
c    -b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨  b^{1, 865}_0
c  in DIMACS:
-3752 -3753  3754 -864  3755 0
-3752 -3753  3754 -864 -3756 0
-3752 -3753  3754 -864  3757 0

c  -1+1 --> 0
c    ( b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0 ∧  p_864) -> (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧ -b^{1, 865}_0)
c  in CNF:
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_2
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_1
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_0
c  in DIMACS:
-3752  3753 -3754 -864 -3755 0
-3752  3753 -3754 -864 -3756 0
-3752  3753 -3754 -864 -3757 0

c  0+1 --> 1
c    (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧  p_864) -> (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0)
c  in CNF:
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_2
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_1
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨  b^{1, 865}_0
c  in DIMACS:
 3752  3753  3754 -864 -3755 0
 3752  3753  3754 -864 -3756 0
 3752  3753  3754 -864  3757 0

c  1+1 --> 2
c    (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0 ∧  p_864) -> (-b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0)
c  in CNF:
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_2
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨  b^{1, 865}_1
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ -p_864 ∨ -b^{1, 865}_0
c  in DIMACS:
 3752  3753 -3754 -864 -3755 0
 3752  3753 -3754 -864  3756 0
 3752  3753 -3754 -864 -3757 0

c  2+1 --> break 
c    (-b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧  p_864) -> break
c  in CNF:
c     b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 3752 -3753  3754 -864 1162 0


c  2-1 --> 1
c    (-b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧ -p_864) -> (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0)
c  in CNF:
c     b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_2
c     b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_1
c     b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨  b^{1, 865}_0
c  in DIMACS:
 3752 -3753  3754  864 -3755 0
 3752 -3753  3754  864 -3756 0
 3752 -3753  3754  864  3757 0

c  1-1 --> 0
c    (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0 ∧ -p_864) -> (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧ -b^{1, 865}_0)
c  in CNF:
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_2
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_1
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_0
c  in DIMACS:
 3752  3753 -3754  864 -3755 0
 3752  3753 -3754  864 -3756 0
 3752  3753 -3754  864 -3757 0

c  0-1 --> -1
c    (-b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧ -p_864) -> ( b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0)
c  in CNF:
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨  b^{1, 865}_2
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_1
c     b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨  b^{1, 865}_0
c  in DIMACS:
 3752  3753  3754  864  3755 0
 3752  3753  3754  864 -3756 0
 3752  3753  3754  864  3757 0

c  -1-1 --> -2
c    ( b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧  b^{1, 864}_0 ∧ -p_864) -> ( b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0)
c  in CNF:
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨  b^{1, 865}_2
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨  b^{1, 865}_1
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨  p_864 ∨ -b^{1, 865}_0
c  in DIMACS:
-3752  3753 -3754  864  3755 0
-3752  3753 -3754  864  3756 0
-3752  3753 -3754  864 -3757 0

c  -2-1 --> break 
c    ( b^{1, 864}_2 ∧  b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨  b^{1, 864}_0 ∨  p_864 ∨ break
c  in DIMACS:
-3752 -3753  3754  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 864}_2 ∧ -b^{1, 864}_1 ∧ -b^{1, 864}_0 ∧ true) 
c  in CNF:
c    -b^{1, 864}_2 ∨  b^{1, 864}_1 ∨  b^{1, 864}_0 ∨ false 
c  in DIMACS:
-3752  3753  3754  0

c  3 does not represent an automaton state.
c    -(-b^{1, 864}_2 ∧  b^{1, 864}_1 ∧  b^{1, 864}_0 ∧ true) 
c  in CNF:
c     b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ false 
c  in DIMACS:
 3752 -3753 -3754  0
c  -3 does not represent an automaton state.
c    -( b^{1, 864}_2 ∧  b^{1, 864}_1 ∧  b^{1, 864}_0 ∧ true) 
c  in CNF:
c    -b^{1, 864}_2 ∨ -b^{1, 864}_1 ∨ -b^{1, 864}_0 ∨ false 
c  in DIMACS:
-3752 -3753 -3754  0

c i = 865
c  -2+1 --> -1
c    ( b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧  p_865) -> ( b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0)
c  in CNF:
c    -b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨  b^{1, 866}_2
c    -b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_1
c    -b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨  b^{1, 866}_0
c  in DIMACS:
-3755 -3756  3757 -865  3758 0
-3755 -3756  3757 -865 -3759 0
-3755 -3756  3757 -865  3760 0

c  -1+1 --> 0
c    ( b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0 ∧  p_865) -> (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧ -b^{1, 866}_0)
c  in CNF:
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_2
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_1
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_0
c  in DIMACS:
-3755  3756 -3757 -865 -3758 0
-3755  3756 -3757 -865 -3759 0
-3755  3756 -3757 -865 -3760 0

c  0+1 --> 1
c    (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧  p_865) -> (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0)
c  in CNF:
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_2
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_1
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨  b^{1, 866}_0
c  in DIMACS:
 3755  3756  3757 -865 -3758 0
 3755  3756  3757 -865 -3759 0
 3755  3756  3757 -865  3760 0

c  1+1 --> 2
c    (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0 ∧  p_865) -> (-b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0)
c  in CNF:
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_2
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨  b^{1, 866}_1
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ -p_865 ∨ -b^{1, 866}_0
c  in DIMACS:
 3755  3756 -3757 -865 -3758 0
 3755  3756 -3757 -865  3759 0
 3755  3756 -3757 -865 -3760 0

c  2+1 --> break 
c    (-b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧  p_865) -> break
c  in CNF:
c     b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ -p_865 ∨ break
c  in DIMACS:
 3755 -3756  3757 -865 1162 0


c  2-1 --> 1
c    (-b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧ -p_865) -> (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0)
c  in CNF:
c     b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_2
c     b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_1
c     b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨  b^{1, 866}_0
c  in DIMACS:
 3755 -3756  3757  865 -3758 0
 3755 -3756  3757  865 -3759 0
 3755 -3756  3757  865  3760 0

c  1-1 --> 0
c    (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0 ∧ -p_865) -> (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧ -b^{1, 866}_0)
c  in CNF:
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_2
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_1
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_0
c  in DIMACS:
 3755  3756 -3757  865 -3758 0
 3755  3756 -3757  865 -3759 0
 3755  3756 -3757  865 -3760 0

c  0-1 --> -1
c    (-b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧ -p_865) -> ( b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0)
c  in CNF:
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨  b^{1, 866}_2
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_1
c     b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨  b^{1, 866}_0
c  in DIMACS:
 3755  3756  3757  865  3758 0
 3755  3756  3757  865 -3759 0
 3755  3756  3757  865  3760 0

c  -1-1 --> -2
c    ( b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧  b^{1, 865}_0 ∧ -p_865) -> ( b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0)
c  in CNF:
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨  b^{1, 866}_2
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨  b^{1, 866}_1
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨  p_865 ∨ -b^{1, 866}_0
c  in DIMACS:
-3755  3756 -3757  865  3758 0
-3755  3756 -3757  865  3759 0
-3755  3756 -3757  865 -3760 0

c  -2-1 --> break 
c    ( b^{1, 865}_2 ∧  b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧ -p_865) -> break
c  in CNF:
c    -b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨  b^{1, 865}_0 ∨  p_865 ∨ break
c  in DIMACS:
-3755 -3756  3757  865 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 865}_2 ∧ -b^{1, 865}_1 ∧ -b^{1, 865}_0 ∧ true) 
c  in CNF:
c    -b^{1, 865}_2 ∨  b^{1, 865}_1 ∨  b^{1, 865}_0 ∨ false 
c  in DIMACS:
-3755  3756  3757  0

c  3 does not represent an automaton state.
c    -(-b^{1, 865}_2 ∧  b^{1, 865}_1 ∧  b^{1, 865}_0 ∧ true) 
c  in CNF:
c     b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ false 
c  in DIMACS:
 3755 -3756 -3757  0
c  -3 does not represent an automaton state.
c    -( b^{1, 865}_2 ∧  b^{1, 865}_1 ∧  b^{1, 865}_0 ∧ true) 
c  in CNF:
c    -b^{1, 865}_2 ∨ -b^{1, 865}_1 ∨ -b^{1, 865}_0 ∨ false 
c  in DIMACS:
-3755 -3756 -3757  0

c i = 866
c  -2+1 --> -1
c    ( b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧  p_866) -> ( b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0)
c  in CNF:
c    -b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨  b^{1, 867}_2
c    -b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_1
c    -b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨  b^{1, 867}_0
c  in DIMACS:
-3758 -3759  3760 -866  3761 0
-3758 -3759  3760 -866 -3762 0
-3758 -3759  3760 -866  3763 0

c  -1+1 --> 0
c    ( b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0 ∧  p_866) -> (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧ -b^{1, 867}_0)
c  in CNF:
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_2
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_1
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_0
c  in DIMACS:
-3758  3759 -3760 -866 -3761 0
-3758  3759 -3760 -866 -3762 0
-3758  3759 -3760 -866 -3763 0

c  0+1 --> 1
c    (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧  p_866) -> (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0)
c  in CNF:
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_2
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_1
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨  b^{1, 867}_0
c  in DIMACS:
 3758  3759  3760 -866 -3761 0
 3758  3759  3760 -866 -3762 0
 3758  3759  3760 -866  3763 0

c  1+1 --> 2
c    (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0 ∧  p_866) -> (-b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0)
c  in CNF:
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_2
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨  b^{1, 867}_1
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ -p_866 ∨ -b^{1, 867}_0
c  in DIMACS:
 3758  3759 -3760 -866 -3761 0
 3758  3759 -3760 -866  3762 0
 3758  3759 -3760 -866 -3763 0

c  2+1 --> break 
c    (-b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧  p_866) -> break
c  in CNF:
c     b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ -p_866 ∨ break
c  in DIMACS:
 3758 -3759  3760 -866 1162 0


c  2-1 --> 1
c    (-b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧ -p_866) -> (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0)
c  in CNF:
c     b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_2
c     b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_1
c     b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨  b^{1, 867}_0
c  in DIMACS:
 3758 -3759  3760  866 -3761 0
 3758 -3759  3760  866 -3762 0
 3758 -3759  3760  866  3763 0

c  1-1 --> 0
c    (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0 ∧ -p_866) -> (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧ -b^{1, 867}_0)
c  in CNF:
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_2
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_1
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_0
c  in DIMACS:
 3758  3759 -3760  866 -3761 0
 3758  3759 -3760  866 -3762 0
 3758  3759 -3760  866 -3763 0

c  0-1 --> -1
c    (-b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧ -p_866) -> ( b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0)
c  in CNF:
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨  b^{1, 867}_2
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_1
c     b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨  b^{1, 867}_0
c  in DIMACS:
 3758  3759  3760  866  3761 0
 3758  3759  3760  866 -3762 0
 3758  3759  3760  866  3763 0

c  -1-1 --> -2
c    ( b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧  b^{1, 866}_0 ∧ -p_866) -> ( b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0)
c  in CNF:
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨  b^{1, 867}_2
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨  b^{1, 867}_1
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨  p_866 ∨ -b^{1, 867}_0
c  in DIMACS:
-3758  3759 -3760  866  3761 0
-3758  3759 -3760  866  3762 0
-3758  3759 -3760  866 -3763 0

c  -2-1 --> break 
c    ( b^{1, 866}_2 ∧  b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧ -p_866) -> break
c  in CNF:
c    -b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨  b^{1, 866}_0 ∨  p_866 ∨ break
c  in DIMACS:
-3758 -3759  3760  866 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 866}_2 ∧ -b^{1, 866}_1 ∧ -b^{1, 866}_0 ∧ true) 
c  in CNF:
c    -b^{1, 866}_2 ∨  b^{1, 866}_1 ∨  b^{1, 866}_0 ∨ false 
c  in DIMACS:
-3758  3759  3760  0

c  3 does not represent an automaton state.
c    -(-b^{1, 866}_2 ∧  b^{1, 866}_1 ∧  b^{1, 866}_0 ∧ true) 
c  in CNF:
c     b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ false 
c  in DIMACS:
 3758 -3759 -3760  0
c  -3 does not represent an automaton state.
c    -( b^{1, 866}_2 ∧  b^{1, 866}_1 ∧  b^{1, 866}_0 ∧ true) 
c  in CNF:
c    -b^{1, 866}_2 ∨ -b^{1, 866}_1 ∨ -b^{1, 866}_0 ∨ false 
c  in DIMACS:
-3758 -3759 -3760  0

c i = 867
c  -2+1 --> -1
c    ( b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧  p_867) -> ( b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0)
c  in CNF:
c    -b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨  b^{1, 868}_2
c    -b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_1
c    -b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨  b^{1, 868}_0
c  in DIMACS:
-3761 -3762  3763 -867  3764 0
-3761 -3762  3763 -867 -3765 0
-3761 -3762  3763 -867  3766 0

c  -1+1 --> 0
c    ( b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0 ∧  p_867) -> (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧ -b^{1, 868}_0)
c  in CNF:
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_2
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_1
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_0
c  in DIMACS:
-3761  3762 -3763 -867 -3764 0
-3761  3762 -3763 -867 -3765 0
-3761  3762 -3763 -867 -3766 0

c  0+1 --> 1
c    (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧  p_867) -> (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0)
c  in CNF:
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_2
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_1
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨  b^{1, 868}_0
c  in DIMACS:
 3761  3762  3763 -867 -3764 0
 3761  3762  3763 -867 -3765 0
 3761  3762  3763 -867  3766 0

c  1+1 --> 2
c    (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0 ∧  p_867) -> (-b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0)
c  in CNF:
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_2
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨  b^{1, 868}_1
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ -p_867 ∨ -b^{1, 868}_0
c  in DIMACS:
 3761  3762 -3763 -867 -3764 0
 3761  3762 -3763 -867  3765 0
 3761  3762 -3763 -867 -3766 0

c  2+1 --> break 
c    (-b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧  p_867) -> break
c  in CNF:
c     b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ -p_867 ∨ break
c  in DIMACS:
 3761 -3762  3763 -867 1162 0


c  2-1 --> 1
c    (-b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧ -p_867) -> (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0)
c  in CNF:
c     b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_2
c     b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_1
c     b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨  b^{1, 868}_0
c  in DIMACS:
 3761 -3762  3763  867 -3764 0
 3761 -3762  3763  867 -3765 0
 3761 -3762  3763  867  3766 0

c  1-1 --> 0
c    (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0 ∧ -p_867) -> (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧ -b^{1, 868}_0)
c  in CNF:
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_2
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_1
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_0
c  in DIMACS:
 3761  3762 -3763  867 -3764 0
 3761  3762 -3763  867 -3765 0
 3761  3762 -3763  867 -3766 0

c  0-1 --> -1
c    (-b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧ -p_867) -> ( b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0)
c  in CNF:
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨  b^{1, 868}_2
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_1
c     b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨  b^{1, 868}_0
c  in DIMACS:
 3761  3762  3763  867  3764 0
 3761  3762  3763  867 -3765 0
 3761  3762  3763  867  3766 0

c  -1-1 --> -2
c    ( b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧  b^{1, 867}_0 ∧ -p_867) -> ( b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0)
c  in CNF:
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨  b^{1, 868}_2
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨  b^{1, 868}_1
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨  p_867 ∨ -b^{1, 868}_0
c  in DIMACS:
-3761  3762 -3763  867  3764 0
-3761  3762 -3763  867  3765 0
-3761  3762 -3763  867 -3766 0

c  -2-1 --> break 
c    ( b^{1, 867}_2 ∧  b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧ -p_867) -> break
c  in CNF:
c    -b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨  b^{1, 867}_0 ∨  p_867 ∨ break
c  in DIMACS:
-3761 -3762  3763  867 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 867}_2 ∧ -b^{1, 867}_1 ∧ -b^{1, 867}_0 ∧ true) 
c  in CNF:
c    -b^{1, 867}_2 ∨  b^{1, 867}_1 ∨  b^{1, 867}_0 ∨ false 
c  in DIMACS:
-3761  3762  3763  0

c  3 does not represent an automaton state.
c    -(-b^{1, 867}_2 ∧  b^{1, 867}_1 ∧  b^{1, 867}_0 ∧ true) 
c  in CNF:
c     b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ false 
c  in DIMACS:
 3761 -3762 -3763  0
c  -3 does not represent an automaton state.
c    -( b^{1, 867}_2 ∧  b^{1, 867}_1 ∧  b^{1, 867}_0 ∧ true) 
c  in CNF:
c    -b^{1, 867}_2 ∨ -b^{1, 867}_1 ∨ -b^{1, 867}_0 ∨ false 
c  in DIMACS:
-3761 -3762 -3763  0

c i = 868
c  -2+1 --> -1
c    ( b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧  p_868) -> ( b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0)
c  in CNF:
c    -b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨  b^{1, 869}_2
c    -b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_1
c    -b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨  b^{1, 869}_0
c  in DIMACS:
-3764 -3765  3766 -868  3767 0
-3764 -3765  3766 -868 -3768 0
-3764 -3765  3766 -868  3769 0

c  -1+1 --> 0
c    ( b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0 ∧  p_868) -> (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧ -b^{1, 869}_0)
c  in CNF:
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_2
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_1
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_0
c  in DIMACS:
-3764  3765 -3766 -868 -3767 0
-3764  3765 -3766 -868 -3768 0
-3764  3765 -3766 -868 -3769 0

c  0+1 --> 1
c    (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧  p_868) -> (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0)
c  in CNF:
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_2
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_1
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨  b^{1, 869}_0
c  in DIMACS:
 3764  3765  3766 -868 -3767 0
 3764  3765  3766 -868 -3768 0
 3764  3765  3766 -868  3769 0

c  1+1 --> 2
c    (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0 ∧  p_868) -> (-b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0)
c  in CNF:
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_2
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨  b^{1, 869}_1
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ -p_868 ∨ -b^{1, 869}_0
c  in DIMACS:
 3764  3765 -3766 -868 -3767 0
 3764  3765 -3766 -868  3768 0
 3764  3765 -3766 -868 -3769 0

c  2+1 --> break 
c    (-b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧  p_868) -> break
c  in CNF:
c     b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 3764 -3765  3766 -868 1162 0


c  2-1 --> 1
c    (-b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧ -p_868) -> (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0)
c  in CNF:
c     b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_2
c     b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_1
c     b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨  b^{1, 869}_0
c  in DIMACS:
 3764 -3765  3766  868 -3767 0
 3764 -3765  3766  868 -3768 0
 3764 -3765  3766  868  3769 0

c  1-1 --> 0
c    (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0 ∧ -p_868) -> (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧ -b^{1, 869}_0)
c  in CNF:
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_2
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_1
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_0
c  in DIMACS:
 3764  3765 -3766  868 -3767 0
 3764  3765 -3766  868 -3768 0
 3764  3765 -3766  868 -3769 0

c  0-1 --> -1
c    (-b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧ -p_868) -> ( b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0)
c  in CNF:
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨  b^{1, 869}_2
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_1
c     b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨  b^{1, 869}_0
c  in DIMACS:
 3764  3765  3766  868  3767 0
 3764  3765  3766  868 -3768 0
 3764  3765  3766  868  3769 0

c  -1-1 --> -2
c    ( b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧  b^{1, 868}_0 ∧ -p_868) -> ( b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0)
c  in CNF:
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨  b^{1, 869}_2
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨  b^{1, 869}_1
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨  p_868 ∨ -b^{1, 869}_0
c  in DIMACS:
-3764  3765 -3766  868  3767 0
-3764  3765 -3766  868  3768 0
-3764  3765 -3766  868 -3769 0

c  -2-1 --> break 
c    ( b^{1, 868}_2 ∧  b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨  b^{1, 868}_0 ∨  p_868 ∨ break
c  in DIMACS:
-3764 -3765  3766  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 868}_2 ∧ -b^{1, 868}_1 ∧ -b^{1, 868}_0 ∧ true) 
c  in CNF:
c    -b^{1, 868}_2 ∨  b^{1, 868}_1 ∨  b^{1, 868}_0 ∨ false 
c  in DIMACS:
-3764  3765  3766  0

c  3 does not represent an automaton state.
c    -(-b^{1, 868}_2 ∧  b^{1, 868}_1 ∧  b^{1, 868}_0 ∧ true) 
c  in CNF:
c     b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ false 
c  in DIMACS:
 3764 -3765 -3766  0
c  -3 does not represent an automaton state.
c    -( b^{1, 868}_2 ∧  b^{1, 868}_1 ∧  b^{1, 868}_0 ∧ true) 
c  in CNF:
c    -b^{1, 868}_2 ∨ -b^{1, 868}_1 ∨ -b^{1, 868}_0 ∨ false 
c  in DIMACS:
-3764 -3765 -3766  0

c i = 869
c  -2+1 --> -1
c    ( b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧  p_869) -> ( b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0)
c  in CNF:
c    -b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨  b^{1, 870}_2
c    -b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_1
c    -b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨  b^{1, 870}_0
c  in DIMACS:
-3767 -3768  3769 -869  3770 0
-3767 -3768  3769 -869 -3771 0
-3767 -3768  3769 -869  3772 0

c  -1+1 --> 0
c    ( b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0 ∧  p_869) -> (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧ -b^{1, 870}_0)
c  in CNF:
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_2
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_1
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_0
c  in DIMACS:
-3767  3768 -3769 -869 -3770 0
-3767  3768 -3769 -869 -3771 0
-3767  3768 -3769 -869 -3772 0

c  0+1 --> 1
c    (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧  p_869) -> (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0)
c  in CNF:
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_2
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_1
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨  b^{1, 870}_0
c  in DIMACS:
 3767  3768  3769 -869 -3770 0
 3767  3768  3769 -869 -3771 0
 3767  3768  3769 -869  3772 0

c  1+1 --> 2
c    (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0 ∧  p_869) -> (-b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0)
c  in CNF:
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_2
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨  b^{1, 870}_1
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ -p_869 ∨ -b^{1, 870}_0
c  in DIMACS:
 3767  3768 -3769 -869 -3770 0
 3767  3768 -3769 -869  3771 0
 3767  3768 -3769 -869 -3772 0

c  2+1 --> break 
c    (-b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧  p_869) -> break
c  in CNF:
c     b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ -p_869 ∨ break
c  in DIMACS:
 3767 -3768  3769 -869 1162 0


c  2-1 --> 1
c    (-b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧ -p_869) -> (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0)
c  in CNF:
c     b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_2
c     b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_1
c     b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨  b^{1, 870}_0
c  in DIMACS:
 3767 -3768  3769  869 -3770 0
 3767 -3768  3769  869 -3771 0
 3767 -3768  3769  869  3772 0

c  1-1 --> 0
c    (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0 ∧ -p_869) -> (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧ -b^{1, 870}_0)
c  in CNF:
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_2
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_1
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_0
c  in DIMACS:
 3767  3768 -3769  869 -3770 0
 3767  3768 -3769  869 -3771 0
 3767  3768 -3769  869 -3772 0

c  0-1 --> -1
c    (-b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧ -p_869) -> ( b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0)
c  in CNF:
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨  b^{1, 870}_2
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_1
c     b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨  b^{1, 870}_0
c  in DIMACS:
 3767  3768  3769  869  3770 0
 3767  3768  3769  869 -3771 0
 3767  3768  3769  869  3772 0

c  -1-1 --> -2
c    ( b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧  b^{1, 869}_0 ∧ -p_869) -> ( b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0)
c  in CNF:
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨  b^{1, 870}_2
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨  b^{1, 870}_1
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨  p_869 ∨ -b^{1, 870}_0
c  in DIMACS:
-3767  3768 -3769  869  3770 0
-3767  3768 -3769  869  3771 0
-3767  3768 -3769  869 -3772 0

c  -2-1 --> break 
c    ( b^{1, 869}_2 ∧  b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧ -p_869) -> break
c  in CNF:
c    -b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨  b^{1, 869}_0 ∨  p_869 ∨ break
c  in DIMACS:
-3767 -3768  3769  869 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 869}_2 ∧ -b^{1, 869}_1 ∧ -b^{1, 869}_0 ∧ true) 
c  in CNF:
c    -b^{1, 869}_2 ∨  b^{1, 869}_1 ∨  b^{1, 869}_0 ∨ false 
c  in DIMACS:
-3767  3768  3769  0

c  3 does not represent an automaton state.
c    -(-b^{1, 869}_2 ∧  b^{1, 869}_1 ∧  b^{1, 869}_0 ∧ true) 
c  in CNF:
c     b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ false 
c  in DIMACS:
 3767 -3768 -3769  0
c  -3 does not represent an automaton state.
c    -( b^{1, 869}_2 ∧  b^{1, 869}_1 ∧  b^{1, 869}_0 ∧ true) 
c  in CNF:
c    -b^{1, 869}_2 ∨ -b^{1, 869}_1 ∨ -b^{1, 869}_0 ∨ false 
c  in DIMACS:
-3767 -3768 -3769  0

c i = 870
c  -2+1 --> -1
c    ( b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧  p_870) -> ( b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0)
c  in CNF:
c    -b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨  b^{1, 871}_2
c    -b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_1
c    -b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨  b^{1, 871}_0
c  in DIMACS:
-3770 -3771  3772 -870  3773 0
-3770 -3771  3772 -870 -3774 0
-3770 -3771  3772 -870  3775 0

c  -1+1 --> 0
c    ( b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0 ∧  p_870) -> (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧ -b^{1, 871}_0)
c  in CNF:
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_2
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_1
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_0
c  in DIMACS:
-3770  3771 -3772 -870 -3773 0
-3770  3771 -3772 -870 -3774 0
-3770  3771 -3772 -870 -3775 0

c  0+1 --> 1
c    (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧  p_870) -> (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0)
c  in CNF:
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_2
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_1
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨  b^{1, 871}_0
c  in DIMACS:
 3770  3771  3772 -870 -3773 0
 3770  3771  3772 -870 -3774 0
 3770  3771  3772 -870  3775 0

c  1+1 --> 2
c    (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0 ∧  p_870) -> (-b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0)
c  in CNF:
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_2
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨  b^{1, 871}_1
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ -p_870 ∨ -b^{1, 871}_0
c  in DIMACS:
 3770  3771 -3772 -870 -3773 0
 3770  3771 -3772 -870  3774 0
 3770  3771 -3772 -870 -3775 0

c  2+1 --> break 
c    (-b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧  p_870) -> break
c  in CNF:
c     b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 3770 -3771  3772 -870 1162 0


c  2-1 --> 1
c    (-b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧ -p_870) -> (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0)
c  in CNF:
c     b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_2
c     b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_1
c     b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨  b^{1, 871}_0
c  in DIMACS:
 3770 -3771  3772  870 -3773 0
 3770 -3771  3772  870 -3774 0
 3770 -3771  3772  870  3775 0

c  1-1 --> 0
c    (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0 ∧ -p_870) -> (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧ -b^{1, 871}_0)
c  in CNF:
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_2
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_1
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_0
c  in DIMACS:
 3770  3771 -3772  870 -3773 0
 3770  3771 -3772  870 -3774 0
 3770  3771 -3772  870 -3775 0

c  0-1 --> -1
c    (-b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧ -p_870) -> ( b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0)
c  in CNF:
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨  b^{1, 871}_2
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_1
c     b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨  b^{1, 871}_0
c  in DIMACS:
 3770  3771  3772  870  3773 0
 3770  3771  3772  870 -3774 0
 3770  3771  3772  870  3775 0

c  -1-1 --> -2
c    ( b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧  b^{1, 870}_0 ∧ -p_870) -> ( b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0)
c  in CNF:
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨  b^{1, 871}_2
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨  b^{1, 871}_1
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨  p_870 ∨ -b^{1, 871}_0
c  in DIMACS:
-3770  3771 -3772  870  3773 0
-3770  3771 -3772  870  3774 0
-3770  3771 -3772  870 -3775 0

c  -2-1 --> break 
c    ( b^{1, 870}_2 ∧  b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨  b^{1, 870}_0 ∨  p_870 ∨ break
c  in DIMACS:
-3770 -3771  3772  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 870}_2 ∧ -b^{1, 870}_1 ∧ -b^{1, 870}_0 ∧ true) 
c  in CNF:
c    -b^{1, 870}_2 ∨  b^{1, 870}_1 ∨  b^{1, 870}_0 ∨ false 
c  in DIMACS:
-3770  3771  3772  0

c  3 does not represent an automaton state.
c    -(-b^{1, 870}_2 ∧  b^{1, 870}_1 ∧  b^{1, 870}_0 ∧ true) 
c  in CNF:
c     b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ false 
c  in DIMACS:
 3770 -3771 -3772  0
c  -3 does not represent an automaton state.
c    -( b^{1, 870}_2 ∧  b^{1, 870}_1 ∧  b^{1, 870}_0 ∧ true) 
c  in CNF:
c    -b^{1, 870}_2 ∨ -b^{1, 870}_1 ∨ -b^{1, 870}_0 ∨ false 
c  in DIMACS:
-3770 -3771 -3772  0

c i = 871
c  -2+1 --> -1
c    ( b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧  p_871) -> ( b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0)
c  in CNF:
c    -b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨  b^{1, 872}_2
c    -b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_1
c    -b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨  b^{1, 872}_0
c  in DIMACS:
-3773 -3774  3775 -871  3776 0
-3773 -3774  3775 -871 -3777 0
-3773 -3774  3775 -871  3778 0

c  -1+1 --> 0
c    ( b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0 ∧  p_871) -> (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧ -b^{1, 872}_0)
c  in CNF:
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_2
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_1
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_0
c  in DIMACS:
-3773  3774 -3775 -871 -3776 0
-3773  3774 -3775 -871 -3777 0
-3773  3774 -3775 -871 -3778 0

c  0+1 --> 1
c    (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧  p_871) -> (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0)
c  in CNF:
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_2
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_1
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨  b^{1, 872}_0
c  in DIMACS:
 3773  3774  3775 -871 -3776 0
 3773  3774  3775 -871 -3777 0
 3773  3774  3775 -871  3778 0

c  1+1 --> 2
c    (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0 ∧  p_871) -> (-b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0)
c  in CNF:
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_2
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨  b^{1, 872}_1
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ -p_871 ∨ -b^{1, 872}_0
c  in DIMACS:
 3773  3774 -3775 -871 -3776 0
 3773  3774 -3775 -871  3777 0
 3773  3774 -3775 -871 -3778 0

c  2+1 --> break 
c    (-b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧  p_871) -> break
c  in CNF:
c     b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ -p_871 ∨ break
c  in DIMACS:
 3773 -3774  3775 -871 1162 0


c  2-1 --> 1
c    (-b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧ -p_871) -> (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0)
c  in CNF:
c     b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_2
c     b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_1
c     b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨  b^{1, 872}_0
c  in DIMACS:
 3773 -3774  3775  871 -3776 0
 3773 -3774  3775  871 -3777 0
 3773 -3774  3775  871  3778 0

c  1-1 --> 0
c    (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0 ∧ -p_871) -> (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧ -b^{1, 872}_0)
c  in CNF:
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_2
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_1
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_0
c  in DIMACS:
 3773  3774 -3775  871 -3776 0
 3773  3774 -3775  871 -3777 0
 3773  3774 -3775  871 -3778 0

c  0-1 --> -1
c    (-b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧ -p_871) -> ( b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0)
c  in CNF:
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨  b^{1, 872}_2
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_1
c     b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨  b^{1, 872}_0
c  in DIMACS:
 3773  3774  3775  871  3776 0
 3773  3774  3775  871 -3777 0
 3773  3774  3775  871  3778 0

c  -1-1 --> -2
c    ( b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧  b^{1, 871}_0 ∧ -p_871) -> ( b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0)
c  in CNF:
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨  b^{1, 872}_2
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨  b^{1, 872}_1
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨  p_871 ∨ -b^{1, 872}_0
c  in DIMACS:
-3773  3774 -3775  871  3776 0
-3773  3774 -3775  871  3777 0
-3773  3774 -3775  871 -3778 0

c  -2-1 --> break 
c    ( b^{1, 871}_2 ∧  b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧ -p_871) -> break
c  in CNF:
c    -b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨  b^{1, 871}_0 ∨  p_871 ∨ break
c  in DIMACS:
-3773 -3774  3775  871 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 871}_2 ∧ -b^{1, 871}_1 ∧ -b^{1, 871}_0 ∧ true) 
c  in CNF:
c    -b^{1, 871}_2 ∨  b^{1, 871}_1 ∨  b^{1, 871}_0 ∨ false 
c  in DIMACS:
-3773  3774  3775  0

c  3 does not represent an automaton state.
c    -(-b^{1, 871}_2 ∧  b^{1, 871}_1 ∧  b^{1, 871}_0 ∧ true) 
c  in CNF:
c     b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ false 
c  in DIMACS:
 3773 -3774 -3775  0
c  -3 does not represent an automaton state.
c    -( b^{1, 871}_2 ∧  b^{1, 871}_1 ∧  b^{1, 871}_0 ∧ true) 
c  in CNF:
c    -b^{1, 871}_2 ∨ -b^{1, 871}_1 ∨ -b^{1, 871}_0 ∨ false 
c  in DIMACS:
-3773 -3774 -3775  0

c i = 872
c  -2+1 --> -1
c    ( b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧  p_872) -> ( b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0)
c  in CNF:
c    -b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨  b^{1, 873}_2
c    -b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_1
c    -b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨  b^{1, 873}_0
c  in DIMACS:
-3776 -3777  3778 -872  3779 0
-3776 -3777  3778 -872 -3780 0
-3776 -3777  3778 -872  3781 0

c  -1+1 --> 0
c    ( b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0 ∧  p_872) -> (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧ -b^{1, 873}_0)
c  in CNF:
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_2
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_1
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_0
c  in DIMACS:
-3776  3777 -3778 -872 -3779 0
-3776  3777 -3778 -872 -3780 0
-3776  3777 -3778 -872 -3781 0

c  0+1 --> 1
c    (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧  p_872) -> (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0)
c  in CNF:
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_2
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_1
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨  b^{1, 873}_0
c  in DIMACS:
 3776  3777  3778 -872 -3779 0
 3776  3777  3778 -872 -3780 0
 3776  3777  3778 -872  3781 0

c  1+1 --> 2
c    (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0 ∧  p_872) -> (-b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0)
c  in CNF:
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_2
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨  b^{1, 873}_1
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ -p_872 ∨ -b^{1, 873}_0
c  in DIMACS:
 3776  3777 -3778 -872 -3779 0
 3776  3777 -3778 -872  3780 0
 3776  3777 -3778 -872 -3781 0

c  2+1 --> break 
c    (-b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧  p_872) -> break
c  in CNF:
c     b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 3776 -3777  3778 -872 1162 0


c  2-1 --> 1
c    (-b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧ -p_872) -> (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0)
c  in CNF:
c     b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_2
c     b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_1
c     b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨  b^{1, 873}_0
c  in DIMACS:
 3776 -3777  3778  872 -3779 0
 3776 -3777  3778  872 -3780 0
 3776 -3777  3778  872  3781 0

c  1-1 --> 0
c    (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0 ∧ -p_872) -> (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧ -b^{1, 873}_0)
c  in CNF:
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_2
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_1
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_0
c  in DIMACS:
 3776  3777 -3778  872 -3779 0
 3776  3777 -3778  872 -3780 0
 3776  3777 -3778  872 -3781 0

c  0-1 --> -1
c    (-b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧ -p_872) -> ( b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0)
c  in CNF:
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨  b^{1, 873}_2
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_1
c     b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨  b^{1, 873}_0
c  in DIMACS:
 3776  3777  3778  872  3779 0
 3776  3777  3778  872 -3780 0
 3776  3777  3778  872  3781 0

c  -1-1 --> -2
c    ( b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧  b^{1, 872}_0 ∧ -p_872) -> ( b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0)
c  in CNF:
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨  b^{1, 873}_2
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨  b^{1, 873}_1
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨  p_872 ∨ -b^{1, 873}_0
c  in DIMACS:
-3776  3777 -3778  872  3779 0
-3776  3777 -3778  872  3780 0
-3776  3777 -3778  872 -3781 0

c  -2-1 --> break 
c    ( b^{1, 872}_2 ∧  b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨  b^{1, 872}_0 ∨  p_872 ∨ break
c  in DIMACS:
-3776 -3777  3778  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 872}_2 ∧ -b^{1, 872}_1 ∧ -b^{1, 872}_0 ∧ true) 
c  in CNF:
c    -b^{1, 872}_2 ∨  b^{1, 872}_1 ∨  b^{1, 872}_0 ∨ false 
c  in DIMACS:
-3776  3777  3778  0

c  3 does not represent an automaton state.
c    -(-b^{1, 872}_2 ∧  b^{1, 872}_1 ∧  b^{1, 872}_0 ∧ true) 
c  in CNF:
c     b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ false 
c  in DIMACS:
 3776 -3777 -3778  0
c  -3 does not represent an automaton state.
c    -( b^{1, 872}_2 ∧  b^{1, 872}_1 ∧  b^{1, 872}_0 ∧ true) 
c  in CNF:
c    -b^{1, 872}_2 ∨ -b^{1, 872}_1 ∨ -b^{1, 872}_0 ∨ false 
c  in DIMACS:
-3776 -3777 -3778  0

c i = 873
c  -2+1 --> -1
c    ( b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧  p_873) -> ( b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0)
c  in CNF:
c    -b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨  b^{1, 874}_2
c    -b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_1
c    -b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨  b^{1, 874}_0
c  in DIMACS:
-3779 -3780  3781 -873  3782 0
-3779 -3780  3781 -873 -3783 0
-3779 -3780  3781 -873  3784 0

c  -1+1 --> 0
c    ( b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0 ∧  p_873) -> (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧ -b^{1, 874}_0)
c  in CNF:
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_2
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_1
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_0
c  in DIMACS:
-3779  3780 -3781 -873 -3782 0
-3779  3780 -3781 -873 -3783 0
-3779  3780 -3781 -873 -3784 0

c  0+1 --> 1
c    (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧  p_873) -> (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0)
c  in CNF:
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_2
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_1
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨  b^{1, 874}_0
c  in DIMACS:
 3779  3780  3781 -873 -3782 0
 3779  3780  3781 -873 -3783 0
 3779  3780  3781 -873  3784 0

c  1+1 --> 2
c    (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0 ∧  p_873) -> (-b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0)
c  in CNF:
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_2
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨  b^{1, 874}_1
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ -p_873 ∨ -b^{1, 874}_0
c  in DIMACS:
 3779  3780 -3781 -873 -3782 0
 3779  3780 -3781 -873  3783 0
 3779  3780 -3781 -873 -3784 0

c  2+1 --> break 
c    (-b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧  p_873) -> break
c  in CNF:
c     b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ -p_873 ∨ break
c  in DIMACS:
 3779 -3780  3781 -873 1162 0


c  2-1 --> 1
c    (-b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧ -p_873) -> (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0)
c  in CNF:
c     b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_2
c     b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_1
c     b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨  b^{1, 874}_0
c  in DIMACS:
 3779 -3780  3781  873 -3782 0
 3779 -3780  3781  873 -3783 0
 3779 -3780  3781  873  3784 0

c  1-1 --> 0
c    (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0 ∧ -p_873) -> (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧ -b^{1, 874}_0)
c  in CNF:
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_2
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_1
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_0
c  in DIMACS:
 3779  3780 -3781  873 -3782 0
 3779  3780 -3781  873 -3783 0
 3779  3780 -3781  873 -3784 0

c  0-1 --> -1
c    (-b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧ -p_873) -> ( b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0)
c  in CNF:
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨  b^{1, 874}_2
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_1
c     b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨  b^{1, 874}_0
c  in DIMACS:
 3779  3780  3781  873  3782 0
 3779  3780  3781  873 -3783 0
 3779  3780  3781  873  3784 0

c  -1-1 --> -2
c    ( b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧  b^{1, 873}_0 ∧ -p_873) -> ( b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0)
c  in CNF:
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨  b^{1, 874}_2
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨  b^{1, 874}_1
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨  p_873 ∨ -b^{1, 874}_0
c  in DIMACS:
-3779  3780 -3781  873  3782 0
-3779  3780 -3781  873  3783 0
-3779  3780 -3781  873 -3784 0

c  -2-1 --> break 
c    ( b^{1, 873}_2 ∧  b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧ -p_873) -> break
c  in CNF:
c    -b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨  b^{1, 873}_0 ∨  p_873 ∨ break
c  in DIMACS:
-3779 -3780  3781  873 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 873}_2 ∧ -b^{1, 873}_1 ∧ -b^{1, 873}_0 ∧ true) 
c  in CNF:
c    -b^{1, 873}_2 ∨  b^{1, 873}_1 ∨  b^{1, 873}_0 ∨ false 
c  in DIMACS:
-3779  3780  3781  0

c  3 does not represent an automaton state.
c    -(-b^{1, 873}_2 ∧  b^{1, 873}_1 ∧  b^{1, 873}_0 ∧ true) 
c  in CNF:
c     b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ false 
c  in DIMACS:
 3779 -3780 -3781  0
c  -3 does not represent an automaton state.
c    -( b^{1, 873}_2 ∧  b^{1, 873}_1 ∧  b^{1, 873}_0 ∧ true) 
c  in CNF:
c    -b^{1, 873}_2 ∨ -b^{1, 873}_1 ∨ -b^{1, 873}_0 ∨ false 
c  in DIMACS:
-3779 -3780 -3781  0

c i = 874
c  -2+1 --> -1
c    ( b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧  p_874) -> ( b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0)
c  in CNF:
c    -b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨  b^{1, 875}_2
c    -b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_1
c    -b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨  b^{1, 875}_0
c  in DIMACS:
-3782 -3783  3784 -874  3785 0
-3782 -3783  3784 -874 -3786 0
-3782 -3783  3784 -874  3787 0

c  -1+1 --> 0
c    ( b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0 ∧  p_874) -> (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧ -b^{1, 875}_0)
c  in CNF:
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_2
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_1
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_0
c  in DIMACS:
-3782  3783 -3784 -874 -3785 0
-3782  3783 -3784 -874 -3786 0
-3782  3783 -3784 -874 -3787 0

c  0+1 --> 1
c    (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧  p_874) -> (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0)
c  in CNF:
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_2
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_1
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨  b^{1, 875}_0
c  in DIMACS:
 3782  3783  3784 -874 -3785 0
 3782  3783  3784 -874 -3786 0
 3782  3783  3784 -874  3787 0

c  1+1 --> 2
c    (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0 ∧  p_874) -> (-b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0)
c  in CNF:
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_2
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨  b^{1, 875}_1
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ -p_874 ∨ -b^{1, 875}_0
c  in DIMACS:
 3782  3783 -3784 -874 -3785 0
 3782  3783 -3784 -874  3786 0
 3782  3783 -3784 -874 -3787 0

c  2+1 --> break 
c    (-b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧  p_874) -> break
c  in CNF:
c     b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 3782 -3783  3784 -874 1162 0


c  2-1 --> 1
c    (-b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧ -p_874) -> (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0)
c  in CNF:
c     b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_2
c     b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_1
c     b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨  b^{1, 875}_0
c  in DIMACS:
 3782 -3783  3784  874 -3785 0
 3782 -3783  3784  874 -3786 0
 3782 -3783  3784  874  3787 0

c  1-1 --> 0
c    (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0 ∧ -p_874) -> (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧ -b^{1, 875}_0)
c  in CNF:
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_2
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_1
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_0
c  in DIMACS:
 3782  3783 -3784  874 -3785 0
 3782  3783 -3784  874 -3786 0
 3782  3783 -3784  874 -3787 0

c  0-1 --> -1
c    (-b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧ -p_874) -> ( b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0)
c  in CNF:
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨  b^{1, 875}_2
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_1
c     b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨  b^{1, 875}_0
c  in DIMACS:
 3782  3783  3784  874  3785 0
 3782  3783  3784  874 -3786 0
 3782  3783  3784  874  3787 0

c  -1-1 --> -2
c    ( b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧  b^{1, 874}_0 ∧ -p_874) -> ( b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0)
c  in CNF:
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨  b^{1, 875}_2
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨  b^{1, 875}_1
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨  p_874 ∨ -b^{1, 875}_0
c  in DIMACS:
-3782  3783 -3784  874  3785 0
-3782  3783 -3784  874  3786 0
-3782  3783 -3784  874 -3787 0

c  -2-1 --> break 
c    ( b^{1, 874}_2 ∧  b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨  b^{1, 874}_0 ∨  p_874 ∨ break
c  in DIMACS:
-3782 -3783  3784  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 874}_2 ∧ -b^{1, 874}_1 ∧ -b^{1, 874}_0 ∧ true) 
c  in CNF:
c    -b^{1, 874}_2 ∨  b^{1, 874}_1 ∨  b^{1, 874}_0 ∨ false 
c  in DIMACS:
-3782  3783  3784  0

c  3 does not represent an automaton state.
c    -(-b^{1, 874}_2 ∧  b^{1, 874}_1 ∧  b^{1, 874}_0 ∧ true) 
c  in CNF:
c     b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ false 
c  in DIMACS:
 3782 -3783 -3784  0
c  -3 does not represent an automaton state.
c    -( b^{1, 874}_2 ∧  b^{1, 874}_1 ∧  b^{1, 874}_0 ∧ true) 
c  in CNF:
c    -b^{1, 874}_2 ∨ -b^{1, 874}_1 ∨ -b^{1, 874}_0 ∨ false 
c  in DIMACS:
-3782 -3783 -3784  0

c i = 875
c  -2+1 --> -1
c    ( b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧  p_875) -> ( b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0)
c  in CNF:
c    -b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨  b^{1, 876}_2
c    -b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_1
c    -b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨  b^{1, 876}_0
c  in DIMACS:
-3785 -3786  3787 -875  3788 0
-3785 -3786  3787 -875 -3789 0
-3785 -3786  3787 -875  3790 0

c  -1+1 --> 0
c    ( b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0 ∧  p_875) -> (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧ -b^{1, 876}_0)
c  in CNF:
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_2
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_1
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_0
c  in DIMACS:
-3785  3786 -3787 -875 -3788 0
-3785  3786 -3787 -875 -3789 0
-3785  3786 -3787 -875 -3790 0

c  0+1 --> 1
c    (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧  p_875) -> (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0)
c  in CNF:
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_2
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_1
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨  b^{1, 876}_0
c  in DIMACS:
 3785  3786  3787 -875 -3788 0
 3785  3786  3787 -875 -3789 0
 3785  3786  3787 -875  3790 0

c  1+1 --> 2
c    (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0 ∧  p_875) -> (-b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0)
c  in CNF:
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_2
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨  b^{1, 876}_1
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ -p_875 ∨ -b^{1, 876}_0
c  in DIMACS:
 3785  3786 -3787 -875 -3788 0
 3785  3786 -3787 -875  3789 0
 3785  3786 -3787 -875 -3790 0

c  2+1 --> break 
c    (-b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧  p_875) -> break
c  in CNF:
c     b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 3785 -3786  3787 -875 1162 0


c  2-1 --> 1
c    (-b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧ -p_875) -> (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0)
c  in CNF:
c     b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_2
c     b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_1
c     b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨  b^{1, 876}_0
c  in DIMACS:
 3785 -3786  3787  875 -3788 0
 3785 -3786  3787  875 -3789 0
 3785 -3786  3787  875  3790 0

c  1-1 --> 0
c    (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0 ∧ -p_875) -> (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧ -b^{1, 876}_0)
c  in CNF:
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_2
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_1
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_0
c  in DIMACS:
 3785  3786 -3787  875 -3788 0
 3785  3786 -3787  875 -3789 0
 3785  3786 -3787  875 -3790 0

c  0-1 --> -1
c    (-b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧ -p_875) -> ( b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0)
c  in CNF:
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨  b^{1, 876}_2
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_1
c     b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨  b^{1, 876}_0
c  in DIMACS:
 3785  3786  3787  875  3788 0
 3785  3786  3787  875 -3789 0
 3785  3786  3787  875  3790 0

c  -1-1 --> -2
c    ( b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧  b^{1, 875}_0 ∧ -p_875) -> ( b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0)
c  in CNF:
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨  b^{1, 876}_2
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨  b^{1, 876}_1
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨  p_875 ∨ -b^{1, 876}_0
c  in DIMACS:
-3785  3786 -3787  875  3788 0
-3785  3786 -3787  875  3789 0
-3785  3786 -3787  875 -3790 0

c  -2-1 --> break 
c    ( b^{1, 875}_2 ∧  b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨  b^{1, 875}_0 ∨  p_875 ∨ break
c  in DIMACS:
-3785 -3786  3787  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 875}_2 ∧ -b^{1, 875}_1 ∧ -b^{1, 875}_0 ∧ true) 
c  in CNF:
c    -b^{1, 875}_2 ∨  b^{1, 875}_1 ∨  b^{1, 875}_0 ∨ false 
c  in DIMACS:
-3785  3786  3787  0

c  3 does not represent an automaton state.
c    -(-b^{1, 875}_2 ∧  b^{1, 875}_1 ∧  b^{1, 875}_0 ∧ true) 
c  in CNF:
c     b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ false 
c  in DIMACS:
 3785 -3786 -3787  0
c  -3 does not represent an automaton state.
c    -( b^{1, 875}_2 ∧  b^{1, 875}_1 ∧  b^{1, 875}_0 ∧ true) 
c  in CNF:
c    -b^{1, 875}_2 ∨ -b^{1, 875}_1 ∨ -b^{1, 875}_0 ∨ false 
c  in DIMACS:
-3785 -3786 -3787  0

c i = 876
c  -2+1 --> -1
c    ( b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧  p_876) -> ( b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0)
c  in CNF:
c    -b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨  b^{1, 877}_2
c    -b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_1
c    -b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨  b^{1, 877}_0
c  in DIMACS:
-3788 -3789  3790 -876  3791 0
-3788 -3789  3790 -876 -3792 0
-3788 -3789  3790 -876  3793 0

c  -1+1 --> 0
c    ( b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0 ∧  p_876) -> (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧ -b^{1, 877}_0)
c  in CNF:
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_2
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_1
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_0
c  in DIMACS:
-3788  3789 -3790 -876 -3791 0
-3788  3789 -3790 -876 -3792 0
-3788  3789 -3790 -876 -3793 0

c  0+1 --> 1
c    (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧  p_876) -> (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0)
c  in CNF:
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_2
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_1
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨  b^{1, 877}_0
c  in DIMACS:
 3788  3789  3790 -876 -3791 0
 3788  3789  3790 -876 -3792 0
 3788  3789  3790 -876  3793 0

c  1+1 --> 2
c    (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0 ∧  p_876) -> (-b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0)
c  in CNF:
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_2
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨  b^{1, 877}_1
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ -p_876 ∨ -b^{1, 877}_0
c  in DIMACS:
 3788  3789 -3790 -876 -3791 0
 3788  3789 -3790 -876  3792 0
 3788  3789 -3790 -876 -3793 0

c  2+1 --> break 
c    (-b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧  p_876) -> break
c  in CNF:
c     b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 3788 -3789  3790 -876 1162 0


c  2-1 --> 1
c    (-b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧ -p_876) -> (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0)
c  in CNF:
c     b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_2
c     b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_1
c     b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨  b^{1, 877}_0
c  in DIMACS:
 3788 -3789  3790  876 -3791 0
 3788 -3789  3790  876 -3792 0
 3788 -3789  3790  876  3793 0

c  1-1 --> 0
c    (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0 ∧ -p_876) -> (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧ -b^{1, 877}_0)
c  in CNF:
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_2
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_1
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_0
c  in DIMACS:
 3788  3789 -3790  876 -3791 0
 3788  3789 -3790  876 -3792 0
 3788  3789 -3790  876 -3793 0

c  0-1 --> -1
c    (-b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧ -p_876) -> ( b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0)
c  in CNF:
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨  b^{1, 877}_2
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_1
c     b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨  b^{1, 877}_0
c  in DIMACS:
 3788  3789  3790  876  3791 0
 3788  3789  3790  876 -3792 0
 3788  3789  3790  876  3793 0

c  -1-1 --> -2
c    ( b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧  b^{1, 876}_0 ∧ -p_876) -> ( b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0)
c  in CNF:
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨  b^{1, 877}_2
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨  b^{1, 877}_1
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨  p_876 ∨ -b^{1, 877}_0
c  in DIMACS:
-3788  3789 -3790  876  3791 0
-3788  3789 -3790  876  3792 0
-3788  3789 -3790  876 -3793 0

c  -2-1 --> break 
c    ( b^{1, 876}_2 ∧  b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨  b^{1, 876}_0 ∨  p_876 ∨ break
c  in DIMACS:
-3788 -3789  3790  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 876}_2 ∧ -b^{1, 876}_1 ∧ -b^{1, 876}_0 ∧ true) 
c  in CNF:
c    -b^{1, 876}_2 ∨  b^{1, 876}_1 ∨  b^{1, 876}_0 ∨ false 
c  in DIMACS:
-3788  3789  3790  0

c  3 does not represent an automaton state.
c    -(-b^{1, 876}_2 ∧  b^{1, 876}_1 ∧  b^{1, 876}_0 ∧ true) 
c  in CNF:
c     b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ false 
c  in DIMACS:
 3788 -3789 -3790  0
c  -3 does not represent an automaton state.
c    -( b^{1, 876}_2 ∧  b^{1, 876}_1 ∧  b^{1, 876}_0 ∧ true) 
c  in CNF:
c    -b^{1, 876}_2 ∨ -b^{1, 876}_1 ∨ -b^{1, 876}_0 ∨ false 
c  in DIMACS:
-3788 -3789 -3790  0

c i = 877
c  -2+1 --> -1
c    ( b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧  p_877) -> ( b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0)
c  in CNF:
c    -b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨  b^{1, 878}_2
c    -b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_1
c    -b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨  b^{1, 878}_0
c  in DIMACS:
-3791 -3792  3793 -877  3794 0
-3791 -3792  3793 -877 -3795 0
-3791 -3792  3793 -877  3796 0

c  -1+1 --> 0
c    ( b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0 ∧  p_877) -> (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧ -b^{1, 878}_0)
c  in CNF:
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_2
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_1
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_0
c  in DIMACS:
-3791  3792 -3793 -877 -3794 0
-3791  3792 -3793 -877 -3795 0
-3791  3792 -3793 -877 -3796 0

c  0+1 --> 1
c    (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧  p_877) -> (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0)
c  in CNF:
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_2
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_1
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨  b^{1, 878}_0
c  in DIMACS:
 3791  3792  3793 -877 -3794 0
 3791  3792  3793 -877 -3795 0
 3791  3792  3793 -877  3796 0

c  1+1 --> 2
c    (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0 ∧  p_877) -> (-b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0)
c  in CNF:
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_2
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨  b^{1, 878}_1
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ -p_877 ∨ -b^{1, 878}_0
c  in DIMACS:
 3791  3792 -3793 -877 -3794 0
 3791  3792 -3793 -877  3795 0
 3791  3792 -3793 -877 -3796 0

c  2+1 --> break 
c    (-b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧  p_877) -> break
c  in CNF:
c     b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ -p_877 ∨ break
c  in DIMACS:
 3791 -3792  3793 -877 1162 0


c  2-1 --> 1
c    (-b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧ -p_877) -> (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0)
c  in CNF:
c     b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_2
c     b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_1
c     b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨  b^{1, 878}_0
c  in DIMACS:
 3791 -3792  3793  877 -3794 0
 3791 -3792  3793  877 -3795 0
 3791 -3792  3793  877  3796 0

c  1-1 --> 0
c    (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0 ∧ -p_877) -> (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧ -b^{1, 878}_0)
c  in CNF:
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_2
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_1
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_0
c  in DIMACS:
 3791  3792 -3793  877 -3794 0
 3791  3792 -3793  877 -3795 0
 3791  3792 -3793  877 -3796 0

c  0-1 --> -1
c    (-b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧ -p_877) -> ( b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0)
c  in CNF:
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨  b^{1, 878}_2
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_1
c     b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨  b^{1, 878}_0
c  in DIMACS:
 3791  3792  3793  877  3794 0
 3791  3792  3793  877 -3795 0
 3791  3792  3793  877  3796 0

c  -1-1 --> -2
c    ( b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧  b^{1, 877}_0 ∧ -p_877) -> ( b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0)
c  in CNF:
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨  b^{1, 878}_2
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨  b^{1, 878}_1
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨  p_877 ∨ -b^{1, 878}_0
c  in DIMACS:
-3791  3792 -3793  877  3794 0
-3791  3792 -3793  877  3795 0
-3791  3792 -3793  877 -3796 0

c  -2-1 --> break 
c    ( b^{1, 877}_2 ∧  b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧ -p_877) -> break
c  in CNF:
c    -b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨  b^{1, 877}_0 ∨  p_877 ∨ break
c  in DIMACS:
-3791 -3792  3793  877 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 877}_2 ∧ -b^{1, 877}_1 ∧ -b^{1, 877}_0 ∧ true) 
c  in CNF:
c    -b^{1, 877}_2 ∨  b^{1, 877}_1 ∨  b^{1, 877}_0 ∨ false 
c  in DIMACS:
-3791  3792  3793  0

c  3 does not represent an automaton state.
c    -(-b^{1, 877}_2 ∧  b^{1, 877}_1 ∧  b^{1, 877}_0 ∧ true) 
c  in CNF:
c     b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ false 
c  in DIMACS:
 3791 -3792 -3793  0
c  -3 does not represent an automaton state.
c    -( b^{1, 877}_2 ∧  b^{1, 877}_1 ∧  b^{1, 877}_0 ∧ true) 
c  in CNF:
c    -b^{1, 877}_2 ∨ -b^{1, 877}_1 ∨ -b^{1, 877}_0 ∨ false 
c  in DIMACS:
-3791 -3792 -3793  0

c i = 878
c  -2+1 --> -1
c    ( b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧  p_878) -> ( b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0)
c  in CNF:
c    -b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨  b^{1, 879}_2
c    -b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_1
c    -b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨  b^{1, 879}_0
c  in DIMACS:
-3794 -3795  3796 -878  3797 0
-3794 -3795  3796 -878 -3798 0
-3794 -3795  3796 -878  3799 0

c  -1+1 --> 0
c    ( b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0 ∧  p_878) -> (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧ -b^{1, 879}_0)
c  in CNF:
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_2
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_1
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_0
c  in DIMACS:
-3794  3795 -3796 -878 -3797 0
-3794  3795 -3796 -878 -3798 0
-3794  3795 -3796 -878 -3799 0

c  0+1 --> 1
c    (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧  p_878) -> (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0)
c  in CNF:
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_2
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_1
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨  b^{1, 879}_0
c  in DIMACS:
 3794  3795  3796 -878 -3797 0
 3794  3795  3796 -878 -3798 0
 3794  3795  3796 -878  3799 0

c  1+1 --> 2
c    (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0 ∧  p_878) -> (-b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0)
c  in CNF:
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_2
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨  b^{1, 879}_1
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ -p_878 ∨ -b^{1, 879}_0
c  in DIMACS:
 3794  3795 -3796 -878 -3797 0
 3794  3795 -3796 -878  3798 0
 3794  3795 -3796 -878 -3799 0

c  2+1 --> break 
c    (-b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧  p_878) -> break
c  in CNF:
c     b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ -p_878 ∨ break
c  in DIMACS:
 3794 -3795  3796 -878 1162 0


c  2-1 --> 1
c    (-b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧ -p_878) -> (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0)
c  in CNF:
c     b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_2
c     b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_1
c     b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨  b^{1, 879}_0
c  in DIMACS:
 3794 -3795  3796  878 -3797 0
 3794 -3795  3796  878 -3798 0
 3794 -3795  3796  878  3799 0

c  1-1 --> 0
c    (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0 ∧ -p_878) -> (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧ -b^{1, 879}_0)
c  in CNF:
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_2
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_1
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_0
c  in DIMACS:
 3794  3795 -3796  878 -3797 0
 3794  3795 -3796  878 -3798 0
 3794  3795 -3796  878 -3799 0

c  0-1 --> -1
c    (-b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧ -p_878) -> ( b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0)
c  in CNF:
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨  b^{1, 879}_2
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_1
c     b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨  b^{1, 879}_0
c  in DIMACS:
 3794  3795  3796  878  3797 0
 3794  3795  3796  878 -3798 0
 3794  3795  3796  878  3799 0

c  -1-1 --> -2
c    ( b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧  b^{1, 878}_0 ∧ -p_878) -> ( b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0)
c  in CNF:
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨  b^{1, 879}_2
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨  b^{1, 879}_1
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨  p_878 ∨ -b^{1, 879}_0
c  in DIMACS:
-3794  3795 -3796  878  3797 0
-3794  3795 -3796  878  3798 0
-3794  3795 -3796  878 -3799 0

c  -2-1 --> break 
c    ( b^{1, 878}_2 ∧  b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧ -p_878) -> break
c  in CNF:
c    -b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨  b^{1, 878}_0 ∨  p_878 ∨ break
c  in DIMACS:
-3794 -3795  3796  878 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 878}_2 ∧ -b^{1, 878}_1 ∧ -b^{1, 878}_0 ∧ true) 
c  in CNF:
c    -b^{1, 878}_2 ∨  b^{1, 878}_1 ∨  b^{1, 878}_0 ∨ false 
c  in DIMACS:
-3794  3795  3796  0

c  3 does not represent an automaton state.
c    -(-b^{1, 878}_2 ∧  b^{1, 878}_1 ∧  b^{1, 878}_0 ∧ true) 
c  in CNF:
c     b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ false 
c  in DIMACS:
 3794 -3795 -3796  0
c  -3 does not represent an automaton state.
c    -( b^{1, 878}_2 ∧  b^{1, 878}_1 ∧  b^{1, 878}_0 ∧ true) 
c  in CNF:
c    -b^{1, 878}_2 ∨ -b^{1, 878}_1 ∨ -b^{1, 878}_0 ∨ false 
c  in DIMACS:
-3794 -3795 -3796  0

c i = 879
c  -2+1 --> -1
c    ( b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧  p_879) -> ( b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0)
c  in CNF:
c    -b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨  b^{1, 880}_2
c    -b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_1
c    -b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨  b^{1, 880}_0
c  in DIMACS:
-3797 -3798  3799 -879  3800 0
-3797 -3798  3799 -879 -3801 0
-3797 -3798  3799 -879  3802 0

c  -1+1 --> 0
c    ( b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0 ∧  p_879) -> (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧ -b^{1, 880}_0)
c  in CNF:
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_2
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_1
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_0
c  in DIMACS:
-3797  3798 -3799 -879 -3800 0
-3797  3798 -3799 -879 -3801 0
-3797  3798 -3799 -879 -3802 0

c  0+1 --> 1
c    (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧  p_879) -> (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0)
c  in CNF:
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_2
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_1
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨  b^{1, 880}_0
c  in DIMACS:
 3797  3798  3799 -879 -3800 0
 3797  3798  3799 -879 -3801 0
 3797  3798  3799 -879  3802 0

c  1+1 --> 2
c    (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0 ∧  p_879) -> (-b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0)
c  in CNF:
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_2
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨  b^{1, 880}_1
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ -p_879 ∨ -b^{1, 880}_0
c  in DIMACS:
 3797  3798 -3799 -879 -3800 0
 3797  3798 -3799 -879  3801 0
 3797  3798 -3799 -879 -3802 0

c  2+1 --> break 
c    (-b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧  p_879) -> break
c  in CNF:
c     b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ -p_879 ∨ break
c  in DIMACS:
 3797 -3798  3799 -879 1162 0


c  2-1 --> 1
c    (-b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧ -p_879) -> (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0)
c  in CNF:
c     b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_2
c     b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_1
c     b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨  b^{1, 880}_0
c  in DIMACS:
 3797 -3798  3799  879 -3800 0
 3797 -3798  3799  879 -3801 0
 3797 -3798  3799  879  3802 0

c  1-1 --> 0
c    (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0 ∧ -p_879) -> (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧ -b^{1, 880}_0)
c  in CNF:
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_2
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_1
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_0
c  in DIMACS:
 3797  3798 -3799  879 -3800 0
 3797  3798 -3799  879 -3801 0
 3797  3798 -3799  879 -3802 0

c  0-1 --> -1
c    (-b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧ -p_879) -> ( b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0)
c  in CNF:
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨  b^{1, 880}_2
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_1
c     b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨  b^{1, 880}_0
c  in DIMACS:
 3797  3798  3799  879  3800 0
 3797  3798  3799  879 -3801 0
 3797  3798  3799  879  3802 0

c  -1-1 --> -2
c    ( b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧  b^{1, 879}_0 ∧ -p_879) -> ( b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0)
c  in CNF:
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨  b^{1, 880}_2
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨  b^{1, 880}_1
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨  p_879 ∨ -b^{1, 880}_0
c  in DIMACS:
-3797  3798 -3799  879  3800 0
-3797  3798 -3799  879  3801 0
-3797  3798 -3799  879 -3802 0

c  -2-1 --> break 
c    ( b^{1, 879}_2 ∧  b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧ -p_879) -> break
c  in CNF:
c    -b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨  b^{1, 879}_0 ∨  p_879 ∨ break
c  in DIMACS:
-3797 -3798  3799  879 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 879}_2 ∧ -b^{1, 879}_1 ∧ -b^{1, 879}_0 ∧ true) 
c  in CNF:
c    -b^{1, 879}_2 ∨  b^{1, 879}_1 ∨  b^{1, 879}_0 ∨ false 
c  in DIMACS:
-3797  3798  3799  0

c  3 does not represent an automaton state.
c    -(-b^{1, 879}_2 ∧  b^{1, 879}_1 ∧  b^{1, 879}_0 ∧ true) 
c  in CNF:
c     b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ false 
c  in DIMACS:
 3797 -3798 -3799  0
c  -3 does not represent an automaton state.
c    -( b^{1, 879}_2 ∧  b^{1, 879}_1 ∧  b^{1, 879}_0 ∧ true) 
c  in CNF:
c    -b^{1, 879}_2 ∨ -b^{1, 879}_1 ∨ -b^{1, 879}_0 ∨ false 
c  in DIMACS:
-3797 -3798 -3799  0

c i = 880
c  -2+1 --> -1
c    ( b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧  p_880) -> ( b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0)
c  in CNF:
c    -b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨  b^{1, 881}_2
c    -b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_1
c    -b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨  b^{1, 881}_0
c  in DIMACS:
-3800 -3801  3802 -880  3803 0
-3800 -3801  3802 -880 -3804 0
-3800 -3801  3802 -880  3805 0

c  -1+1 --> 0
c    ( b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0 ∧  p_880) -> (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧ -b^{1, 881}_0)
c  in CNF:
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_2
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_1
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_0
c  in DIMACS:
-3800  3801 -3802 -880 -3803 0
-3800  3801 -3802 -880 -3804 0
-3800  3801 -3802 -880 -3805 0

c  0+1 --> 1
c    (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧  p_880) -> (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0)
c  in CNF:
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_2
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_1
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨  b^{1, 881}_0
c  in DIMACS:
 3800  3801  3802 -880 -3803 0
 3800  3801  3802 -880 -3804 0
 3800  3801  3802 -880  3805 0

c  1+1 --> 2
c    (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0 ∧  p_880) -> (-b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0)
c  in CNF:
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_2
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨  b^{1, 881}_1
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ -p_880 ∨ -b^{1, 881}_0
c  in DIMACS:
 3800  3801 -3802 -880 -3803 0
 3800  3801 -3802 -880  3804 0
 3800  3801 -3802 -880 -3805 0

c  2+1 --> break 
c    (-b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧  p_880) -> break
c  in CNF:
c     b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 3800 -3801  3802 -880 1162 0


c  2-1 --> 1
c    (-b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧ -p_880) -> (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0)
c  in CNF:
c     b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_2
c     b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_1
c     b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨  b^{1, 881}_0
c  in DIMACS:
 3800 -3801  3802  880 -3803 0
 3800 -3801  3802  880 -3804 0
 3800 -3801  3802  880  3805 0

c  1-1 --> 0
c    (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0 ∧ -p_880) -> (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧ -b^{1, 881}_0)
c  in CNF:
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_2
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_1
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_0
c  in DIMACS:
 3800  3801 -3802  880 -3803 0
 3800  3801 -3802  880 -3804 0
 3800  3801 -3802  880 -3805 0

c  0-1 --> -1
c    (-b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧ -p_880) -> ( b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0)
c  in CNF:
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨  b^{1, 881}_2
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_1
c     b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨  b^{1, 881}_0
c  in DIMACS:
 3800  3801  3802  880  3803 0
 3800  3801  3802  880 -3804 0
 3800  3801  3802  880  3805 0

c  -1-1 --> -2
c    ( b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧  b^{1, 880}_0 ∧ -p_880) -> ( b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0)
c  in CNF:
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨  b^{1, 881}_2
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨  b^{1, 881}_1
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨  p_880 ∨ -b^{1, 881}_0
c  in DIMACS:
-3800  3801 -3802  880  3803 0
-3800  3801 -3802  880  3804 0
-3800  3801 -3802  880 -3805 0

c  -2-1 --> break 
c    ( b^{1, 880}_2 ∧  b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨  b^{1, 880}_0 ∨  p_880 ∨ break
c  in DIMACS:
-3800 -3801  3802  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 880}_2 ∧ -b^{1, 880}_1 ∧ -b^{1, 880}_0 ∧ true) 
c  in CNF:
c    -b^{1, 880}_2 ∨  b^{1, 880}_1 ∨  b^{1, 880}_0 ∨ false 
c  in DIMACS:
-3800  3801  3802  0

c  3 does not represent an automaton state.
c    -(-b^{1, 880}_2 ∧  b^{1, 880}_1 ∧  b^{1, 880}_0 ∧ true) 
c  in CNF:
c     b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ false 
c  in DIMACS:
 3800 -3801 -3802  0
c  -3 does not represent an automaton state.
c    -( b^{1, 880}_2 ∧  b^{1, 880}_1 ∧  b^{1, 880}_0 ∧ true) 
c  in CNF:
c    -b^{1, 880}_2 ∨ -b^{1, 880}_1 ∨ -b^{1, 880}_0 ∨ false 
c  in DIMACS:
-3800 -3801 -3802  0

c i = 881
c  -2+1 --> -1
c    ( b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧  p_881) -> ( b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0)
c  in CNF:
c    -b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨  b^{1, 882}_2
c    -b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_1
c    -b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨  b^{1, 882}_0
c  in DIMACS:
-3803 -3804  3805 -881  3806 0
-3803 -3804  3805 -881 -3807 0
-3803 -3804  3805 -881  3808 0

c  -1+1 --> 0
c    ( b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0 ∧  p_881) -> (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧ -b^{1, 882}_0)
c  in CNF:
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_2
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_1
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_0
c  in DIMACS:
-3803  3804 -3805 -881 -3806 0
-3803  3804 -3805 -881 -3807 0
-3803  3804 -3805 -881 -3808 0

c  0+1 --> 1
c    (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧  p_881) -> (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0)
c  in CNF:
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_2
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_1
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨  b^{1, 882}_0
c  in DIMACS:
 3803  3804  3805 -881 -3806 0
 3803  3804  3805 -881 -3807 0
 3803  3804  3805 -881  3808 0

c  1+1 --> 2
c    (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0 ∧  p_881) -> (-b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0)
c  in CNF:
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_2
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨  b^{1, 882}_1
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ -p_881 ∨ -b^{1, 882}_0
c  in DIMACS:
 3803  3804 -3805 -881 -3806 0
 3803  3804 -3805 -881  3807 0
 3803  3804 -3805 -881 -3808 0

c  2+1 --> break 
c    (-b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧  p_881) -> break
c  in CNF:
c     b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ -p_881 ∨ break
c  in DIMACS:
 3803 -3804  3805 -881 1162 0


c  2-1 --> 1
c    (-b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧ -p_881) -> (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0)
c  in CNF:
c     b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_2
c     b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_1
c     b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨  b^{1, 882}_0
c  in DIMACS:
 3803 -3804  3805  881 -3806 0
 3803 -3804  3805  881 -3807 0
 3803 -3804  3805  881  3808 0

c  1-1 --> 0
c    (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0 ∧ -p_881) -> (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧ -b^{1, 882}_0)
c  in CNF:
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_2
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_1
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_0
c  in DIMACS:
 3803  3804 -3805  881 -3806 0
 3803  3804 -3805  881 -3807 0
 3803  3804 -3805  881 -3808 0

c  0-1 --> -1
c    (-b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧ -p_881) -> ( b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0)
c  in CNF:
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨  b^{1, 882}_2
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_1
c     b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨  b^{1, 882}_0
c  in DIMACS:
 3803  3804  3805  881  3806 0
 3803  3804  3805  881 -3807 0
 3803  3804  3805  881  3808 0

c  -1-1 --> -2
c    ( b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧  b^{1, 881}_0 ∧ -p_881) -> ( b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0)
c  in CNF:
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨  b^{1, 882}_2
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨  b^{1, 882}_1
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨  p_881 ∨ -b^{1, 882}_0
c  in DIMACS:
-3803  3804 -3805  881  3806 0
-3803  3804 -3805  881  3807 0
-3803  3804 -3805  881 -3808 0

c  -2-1 --> break 
c    ( b^{1, 881}_2 ∧  b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧ -p_881) -> break
c  in CNF:
c    -b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨  b^{1, 881}_0 ∨  p_881 ∨ break
c  in DIMACS:
-3803 -3804  3805  881 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 881}_2 ∧ -b^{1, 881}_1 ∧ -b^{1, 881}_0 ∧ true) 
c  in CNF:
c    -b^{1, 881}_2 ∨  b^{1, 881}_1 ∨  b^{1, 881}_0 ∨ false 
c  in DIMACS:
-3803  3804  3805  0

c  3 does not represent an automaton state.
c    -(-b^{1, 881}_2 ∧  b^{1, 881}_1 ∧  b^{1, 881}_0 ∧ true) 
c  in CNF:
c     b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ false 
c  in DIMACS:
 3803 -3804 -3805  0
c  -3 does not represent an automaton state.
c    -( b^{1, 881}_2 ∧  b^{1, 881}_1 ∧  b^{1, 881}_0 ∧ true) 
c  in CNF:
c    -b^{1, 881}_2 ∨ -b^{1, 881}_1 ∨ -b^{1, 881}_0 ∨ false 
c  in DIMACS:
-3803 -3804 -3805  0

c i = 882
c  -2+1 --> -1
c    ( b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧  p_882) -> ( b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0)
c  in CNF:
c    -b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨  b^{1, 883}_2
c    -b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_1
c    -b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨  b^{1, 883}_0
c  in DIMACS:
-3806 -3807  3808 -882  3809 0
-3806 -3807  3808 -882 -3810 0
-3806 -3807  3808 -882  3811 0

c  -1+1 --> 0
c    ( b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0 ∧  p_882) -> (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧ -b^{1, 883}_0)
c  in CNF:
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_2
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_1
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_0
c  in DIMACS:
-3806  3807 -3808 -882 -3809 0
-3806  3807 -3808 -882 -3810 0
-3806  3807 -3808 -882 -3811 0

c  0+1 --> 1
c    (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧  p_882) -> (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0)
c  in CNF:
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_2
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_1
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨  b^{1, 883}_0
c  in DIMACS:
 3806  3807  3808 -882 -3809 0
 3806  3807  3808 -882 -3810 0
 3806  3807  3808 -882  3811 0

c  1+1 --> 2
c    (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0 ∧  p_882) -> (-b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0)
c  in CNF:
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_2
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨  b^{1, 883}_1
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ -p_882 ∨ -b^{1, 883}_0
c  in DIMACS:
 3806  3807 -3808 -882 -3809 0
 3806  3807 -3808 -882  3810 0
 3806  3807 -3808 -882 -3811 0

c  2+1 --> break 
c    (-b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧  p_882) -> break
c  in CNF:
c     b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 3806 -3807  3808 -882 1162 0


c  2-1 --> 1
c    (-b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧ -p_882) -> (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0)
c  in CNF:
c     b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_2
c     b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_1
c     b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨  b^{1, 883}_0
c  in DIMACS:
 3806 -3807  3808  882 -3809 0
 3806 -3807  3808  882 -3810 0
 3806 -3807  3808  882  3811 0

c  1-1 --> 0
c    (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0 ∧ -p_882) -> (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧ -b^{1, 883}_0)
c  in CNF:
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_2
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_1
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_0
c  in DIMACS:
 3806  3807 -3808  882 -3809 0
 3806  3807 -3808  882 -3810 0
 3806  3807 -3808  882 -3811 0

c  0-1 --> -1
c    (-b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧ -p_882) -> ( b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0)
c  in CNF:
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨  b^{1, 883}_2
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_1
c     b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨  b^{1, 883}_0
c  in DIMACS:
 3806  3807  3808  882  3809 0
 3806  3807  3808  882 -3810 0
 3806  3807  3808  882  3811 0

c  -1-1 --> -2
c    ( b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧  b^{1, 882}_0 ∧ -p_882) -> ( b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0)
c  in CNF:
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨  b^{1, 883}_2
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨  b^{1, 883}_1
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨  p_882 ∨ -b^{1, 883}_0
c  in DIMACS:
-3806  3807 -3808  882  3809 0
-3806  3807 -3808  882  3810 0
-3806  3807 -3808  882 -3811 0

c  -2-1 --> break 
c    ( b^{1, 882}_2 ∧  b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨  b^{1, 882}_0 ∨  p_882 ∨ break
c  in DIMACS:
-3806 -3807  3808  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 882}_2 ∧ -b^{1, 882}_1 ∧ -b^{1, 882}_0 ∧ true) 
c  in CNF:
c    -b^{1, 882}_2 ∨  b^{1, 882}_1 ∨  b^{1, 882}_0 ∨ false 
c  in DIMACS:
-3806  3807  3808  0

c  3 does not represent an automaton state.
c    -(-b^{1, 882}_2 ∧  b^{1, 882}_1 ∧  b^{1, 882}_0 ∧ true) 
c  in CNF:
c     b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ false 
c  in DIMACS:
 3806 -3807 -3808  0
c  -3 does not represent an automaton state.
c    -( b^{1, 882}_2 ∧  b^{1, 882}_1 ∧  b^{1, 882}_0 ∧ true) 
c  in CNF:
c    -b^{1, 882}_2 ∨ -b^{1, 882}_1 ∨ -b^{1, 882}_0 ∨ false 
c  in DIMACS:
-3806 -3807 -3808  0

c i = 883
c  -2+1 --> -1
c    ( b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧  p_883) -> ( b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0)
c  in CNF:
c    -b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨  b^{1, 884}_2
c    -b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_1
c    -b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨  b^{1, 884}_0
c  in DIMACS:
-3809 -3810  3811 -883  3812 0
-3809 -3810  3811 -883 -3813 0
-3809 -3810  3811 -883  3814 0

c  -1+1 --> 0
c    ( b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0 ∧  p_883) -> (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧ -b^{1, 884}_0)
c  in CNF:
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_2
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_1
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_0
c  in DIMACS:
-3809  3810 -3811 -883 -3812 0
-3809  3810 -3811 -883 -3813 0
-3809  3810 -3811 -883 -3814 0

c  0+1 --> 1
c    (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧  p_883) -> (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0)
c  in CNF:
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_2
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_1
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨  b^{1, 884}_0
c  in DIMACS:
 3809  3810  3811 -883 -3812 0
 3809  3810  3811 -883 -3813 0
 3809  3810  3811 -883  3814 0

c  1+1 --> 2
c    (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0 ∧  p_883) -> (-b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0)
c  in CNF:
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_2
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨  b^{1, 884}_1
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ -p_883 ∨ -b^{1, 884}_0
c  in DIMACS:
 3809  3810 -3811 -883 -3812 0
 3809  3810 -3811 -883  3813 0
 3809  3810 -3811 -883 -3814 0

c  2+1 --> break 
c    (-b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧  p_883) -> break
c  in CNF:
c     b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ -p_883 ∨ break
c  in DIMACS:
 3809 -3810  3811 -883 1162 0


c  2-1 --> 1
c    (-b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧ -p_883) -> (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0)
c  in CNF:
c     b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_2
c     b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_1
c     b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨  b^{1, 884}_0
c  in DIMACS:
 3809 -3810  3811  883 -3812 0
 3809 -3810  3811  883 -3813 0
 3809 -3810  3811  883  3814 0

c  1-1 --> 0
c    (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0 ∧ -p_883) -> (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧ -b^{1, 884}_0)
c  in CNF:
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_2
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_1
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_0
c  in DIMACS:
 3809  3810 -3811  883 -3812 0
 3809  3810 -3811  883 -3813 0
 3809  3810 -3811  883 -3814 0

c  0-1 --> -1
c    (-b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧ -p_883) -> ( b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0)
c  in CNF:
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨  b^{1, 884}_2
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_1
c     b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨  b^{1, 884}_0
c  in DIMACS:
 3809  3810  3811  883  3812 0
 3809  3810  3811  883 -3813 0
 3809  3810  3811  883  3814 0

c  -1-1 --> -2
c    ( b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧  b^{1, 883}_0 ∧ -p_883) -> ( b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0)
c  in CNF:
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨  b^{1, 884}_2
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨  b^{1, 884}_1
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨  p_883 ∨ -b^{1, 884}_0
c  in DIMACS:
-3809  3810 -3811  883  3812 0
-3809  3810 -3811  883  3813 0
-3809  3810 -3811  883 -3814 0

c  -2-1 --> break 
c    ( b^{1, 883}_2 ∧  b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧ -p_883) -> break
c  in CNF:
c    -b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨  b^{1, 883}_0 ∨  p_883 ∨ break
c  in DIMACS:
-3809 -3810  3811  883 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 883}_2 ∧ -b^{1, 883}_1 ∧ -b^{1, 883}_0 ∧ true) 
c  in CNF:
c    -b^{1, 883}_2 ∨  b^{1, 883}_1 ∨  b^{1, 883}_0 ∨ false 
c  in DIMACS:
-3809  3810  3811  0

c  3 does not represent an automaton state.
c    -(-b^{1, 883}_2 ∧  b^{1, 883}_1 ∧  b^{1, 883}_0 ∧ true) 
c  in CNF:
c     b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ false 
c  in DIMACS:
 3809 -3810 -3811  0
c  -3 does not represent an automaton state.
c    -( b^{1, 883}_2 ∧  b^{1, 883}_1 ∧  b^{1, 883}_0 ∧ true) 
c  in CNF:
c    -b^{1, 883}_2 ∨ -b^{1, 883}_1 ∨ -b^{1, 883}_0 ∨ false 
c  in DIMACS:
-3809 -3810 -3811  0

c i = 884
c  -2+1 --> -1
c    ( b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧  p_884) -> ( b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0)
c  in CNF:
c    -b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨  b^{1, 885}_2
c    -b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_1
c    -b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨  b^{1, 885}_0
c  in DIMACS:
-3812 -3813  3814 -884  3815 0
-3812 -3813  3814 -884 -3816 0
-3812 -3813  3814 -884  3817 0

c  -1+1 --> 0
c    ( b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0 ∧  p_884) -> (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧ -b^{1, 885}_0)
c  in CNF:
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_2
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_1
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_0
c  in DIMACS:
-3812  3813 -3814 -884 -3815 0
-3812  3813 -3814 -884 -3816 0
-3812  3813 -3814 -884 -3817 0

c  0+1 --> 1
c    (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧  p_884) -> (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0)
c  in CNF:
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_2
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_1
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨  b^{1, 885}_0
c  in DIMACS:
 3812  3813  3814 -884 -3815 0
 3812  3813  3814 -884 -3816 0
 3812  3813  3814 -884  3817 0

c  1+1 --> 2
c    (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0 ∧  p_884) -> (-b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0)
c  in CNF:
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_2
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨  b^{1, 885}_1
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ -p_884 ∨ -b^{1, 885}_0
c  in DIMACS:
 3812  3813 -3814 -884 -3815 0
 3812  3813 -3814 -884  3816 0
 3812  3813 -3814 -884 -3817 0

c  2+1 --> break 
c    (-b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧  p_884) -> break
c  in CNF:
c     b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 3812 -3813  3814 -884 1162 0


c  2-1 --> 1
c    (-b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧ -p_884) -> (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0)
c  in CNF:
c     b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_2
c     b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_1
c     b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨  b^{1, 885}_0
c  in DIMACS:
 3812 -3813  3814  884 -3815 0
 3812 -3813  3814  884 -3816 0
 3812 -3813  3814  884  3817 0

c  1-1 --> 0
c    (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0 ∧ -p_884) -> (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧ -b^{1, 885}_0)
c  in CNF:
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_2
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_1
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_0
c  in DIMACS:
 3812  3813 -3814  884 -3815 0
 3812  3813 -3814  884 -3816 0
 3812  3813 -3814  884 -3817 0

c  0-1 --> -1
c    (-b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧ -p_884) -> ( b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0)
c  in CNF:
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨  b^{1, 885}_2
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_1
c     b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨  b^{1, 885}_0
c  in DIMACS:
 3812  3813  3814  884  3815 0
 3812  3813  3814  884 -3816 0
 3812  3813  3814  884  3817 0

c  -1-1 --> -2
c    ( b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧  b^{1, 884}_0 ∧ -p_884) -> ( b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0)
c  in CNF:
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨  b^{1, 885}_2
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨  b^{1, 885}_1
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨  p_884 ∨ -b^{1, 885}_0
c  in DIMACS:
-3812  3813 -3814  884  3815 0
-3812  3813 -3814  884  3816 0
-3812  3813 -3814  884 -3817 0

c  -2-1 --> break 
c    ( b^{1, 884}_2 ∧  b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨  b^{1, 884}_0 ∨  p_884 ∨ break
c  in DIMACS:
-3812 -3813  3814  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 884}_2 ∧ -b^{1, 884}_1 ∧ -b^{1, 884}_0 ∧ true) 
c  in CNF:
c    -b^{1, 884}_2 ∨  b^{1, 884}_1 ∨  b^{1, 884}_0 ∨ false 
c  in DIMACS:
-3812  3813  3814  0

c  3 does not represent an automaton state.
c    -(-b^{1, 884}_2 ∧  b^{1, 884}_1 ∧  b^{1, 884}_0 ∧ true) 
c  in CNF:
c     b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ false 
c  in DIMACS:
 3812 -3813 -3814  0
c  -3 does not represent an automaton state.
c    -( b^{1, 884}_2 ∧  b^{1, 884}_1 ∧  b^{1, 884}_0 ∧ true) 
c  in CNF:
c    -b^{1, 884}_2 ∨ -b^{1, 884}_1 ∨ -b^{1, 884}_0 ∨ false 
c  in DIMACS:
-3812 -3813 -3814  0

c i = 885
c  -2+1 --> -1
c    ( b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧  p_885) -> ( b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0)
c  in CNF:
c    -b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨  b^{1, 886}_2
c    -b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_1
c    -b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨  b^{1, 886}_0
c  in DIMACS:
-3815 -3816  3817 -885  3818 0
-3815 -3816  3817 -885 -3819 0
-3815 -3816  3817 -885  3820 0

c  -1+1 --> 0
c    ( b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0 ∧  p_885) -> (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧ -b^{1, 886}_0)
c  in CNF:
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_2
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_1
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_0
c  in DIMACS:
-3815  3816 -3817 -885 -3818 0
-3815  3816 -3817 -885 -3819 0
-3815  3816 -3817 -885 -3820 0

c  0+1 --> 1
c    (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧  p_885) -> (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0)
c  in CNF:
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_2
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_1
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨  b^{1, 886}_0
c  in DIMACS:
 3815  3816  3817 -885 -3818 0
 3815  3816  3817 -885 -3819 0
 3815  3816  3817 -885  3820 0

c  1+1 --> 2
c    (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0 ∧  p_885) -> (-b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0)
c  in CNF:
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_2
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨  b^{1, 886}_1
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ -p_885 ∨ -b^{1, 886}_0
c  in DIMACS:
 3815  3816 -3817 -885 -3818 0
 3815  3816 -3817 -885  3819 0
 3815  3816 -3817 -885 -3820 0

c  2+1 --> break 
c    (-b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧  p_885) -> break
c  in CNF:
c     b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 3815 -3816  3817 -885 1162 0


c  2-1 --> 1
c    (-b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧ -p_885) -> (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0)
c  in CNF:
c     b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_2
c     b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_1
c     b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨  b^{1, 886}_0
c  in DIMACS:
 3815 -3816  3817  885 -3818 0
 3815 -3816  3817  885 -3819 0
 3815 -3816  3817  885  3820 0

c  1-1 --> 0
c    (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0 ∧ -p_885) -> (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧ -b^{1, 886}_0)
c  in CNF:
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_2
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_1
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_0
c  in DIMACS:
 3815  3816 -3817  885 -3818 0
 3815  3816 -3817  885 -3819 0
 3815  3816 -3817  885 -3820 0

c  0-1 --> -1
c    (-b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧ -p_885) -> ( b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0)
c  in CNF:
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨  b^{1, 886}_2
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_1
c     b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨  b^{1, 886}_0
c  in DIMACS:
 3815  3816  3817  885  3818 0
 3815  3816  3817  885 -3819 0
 3815  3816  3817  885  3820 0

c  -1-1 --> -2
c    ( b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧  b^{1, 885}_0 ∧ -p_885) -> ( b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0)
c  in CNF:
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨  b^{1, 886}_2
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨  b^{1, 886}_1
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨  p_885 ∨ -b^{1, 886}_0
c  in DIMACS:
-3815  3816 -3817  885  3818 0
-3815  3816 -3817  885  3819 0
-3815  3816 -3817  885 -3820 0

c  -2-1 --> break 
c    ( b^{1, 885}_2 ∧  b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨  b^{1, 885}_0 ∨  p_885 ∨ break
c  in DIMACS:
-3815 -3816  3817  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 885}_2 ∧ -b^{1, 885}_1 ∧ -b^{1, 885}_0 ∧ true) 
c  in CNF:
c    -b^{1, 885}_2 ∨  b^{1, 885}_1 ∨  b^{1, 885}_0 ∨ false 
c  in DIMACS:
-3815  3816  3817  0

c  3 does not represent an automaton state.
c    -(-b^{1, 885}_2 ∧  b^{1, 885}_1 ∧  b^{1, 885}_0 ∧ true) 
c  in CNF:
c     b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ false 
c  in DIMACS:
 3815 -3816 -3817  0
c  -3 does not represent an automaton state.
c    -( b^{1, 885}_2 ∧  b^{1, 885}_1 ∧  b^{1, 885}_0 ∧ true) 
c  in CNF:
c    -b^{1, 885}_2 ∨ -b^{1, 885}_1 ∨ -b^{1, 885}_0 ∨ false 
c  in DIMACS:
-3815 -3816 -3817  0

c i = 886
c  -2+1 --> -1
c    ( b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧  p_886) -> ( b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0)
c  in CNF:
c    -b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨  b^{1, 887}_2
c    -b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_1
c    -b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨  b^{1, 887}_0
c  in DIMACS:
-3818 -3819  3820 -886  3821 0
-3818 -3819  3820 -886 -3822 0
-3818 -3819  3820 -886  3823 0

c  -1+1 --> 0
c    ( b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0 ∧  p_886) -> (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧ -b^{1, 887}_0)
c  in CNF:
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_2
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_1
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_0
c  in DIMACS:
-3818  3819 -3820 -886 -3821 0
-3818  3819 -3820 -886 -3822 0
-3818  3819 -3820 -886 -3823 0

c  0+1 --> 1
c    (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧  p_886) -> (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0)
c  in CNF:
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_2
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_1
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨  b^{1, 887}_0
c  in DIMACS:
 3818  3819  3820 -886 -3821 0
 3818  3819  3820 -886 -3822 0
 3818  3819  3820 -886  3823 0

c  1+1 --> 2
c    (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0 ∧  p_886) -> (-b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0)
c  in CNF:
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_2
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨  b^{1, 887}_1
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ -p_886 ∨ -b^{1, 887}_0
c  in DIMACS:
 3818  3819 -3820 -886 -3821 0
 3818  3819 -3820 -886  3822 0
 3818  3819 -3820 -886 -3823 0

c  2+1 --> break 
c    (-b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧  p_886) -> break
c  in CNF:
c     b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ -p_886 ∨ break
c  in DIMACS:
 3818 -3819  3820 -886 1162 0


c  2-1 --> 1
c    (-b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧ -p_886) -> (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0)
c  in CNF:
c     b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_2
c     b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_1
c     b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨  b^{1, 887}_0
c  in DIMACS:
 3818 -3819  3820  886 -3821 0
 3818 -3819  3820  886 -3822 0
 3818 -3819  3820  886  3823 0

c  1-1 --> 0
c    (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0 ∧ -p_886) -> (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧ -b^{1, 887}_0)
c  in CNF:
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_2
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_1
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_0
c  in DIMACS:
 3818  3819 -3820  886 -3821 0
 3818  3819 -3820  886 -3822 0
 3818  3819 -3820  886 -3823 0

c  0-1 --> -1
c    (-b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧ -p_886) -> ( b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0)
c  in CNF:
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨  b^{1, 887}_2
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_1
c     b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨  b^{1, 887}_0
c  in DIMACS:
 3818  3819  3820  886  3821 0
 3818  3819  3820  886 -3822 0
 3818  3819  3820  886  3823 0

c  -1-1 --> -2
c    ( b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧  b^{1, 886}_0 ∧ -p_886) -> ( b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0)
c  in CNF:
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨  b^{1, 887}_2
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨  b^{1, 887}_1
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨  p_886 ∨ -b^{1, 887}_0
c  in DIMACS:
-3818  3819 -3820  886  3821 0
-3818  3819 -3820  886  3822 0
-3818  3819 -3820  886 -3823 0

c  -2-1 --> break 
c    ( b^{1, 886}_2 ∧  b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧ -p_886) -> break
c  in CNF:
c    -b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨  b^{1, 886}_0 ∨  p_886 ∨ break
c  in DIMACS:
-3818 -3819  3820  886 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 886}_2 ∧ -b^{1, 886}_1 ∧ -b^{1, 886}_0 ∧ true) 
c  in CNF:
c    -b^{1, 886}_2 ∨  b^{1, 886}_1 ∨  b^{1, 886}_0 ∨ false 
c  in DIMACS:
-3818  3819  3820  0

c  3 does not represent an automaton state.
c    -(-b^{1, 886}_2 ∧  b^{1, 886}_1 ∧  b^{1, 886}_0 ∧ true) 
c  in CNF:
c     b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ false 
c  in DIMACS:
 3818 -3819 -3820  0
c  -3 does not represent an automaton state.
c    -( b^{1, 886}_2 ∧  b^{1, 886}_1 ∧  b^{1, 886}_0 ∧ true) 
c  in CNF:
c    -b^{1, 886}_2 ∨ -b^{1, 886}_1 ∨ -b^{1, 886}_0 ∨ false 
c  in DIMACS:
-3818 -3819 -3820  0

c i = 887
c  -2+1 --> -1
c    ( b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧  p_887) -> ( b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0)
c  in CNF:
c    -b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨  b^{1, 888}_2
c    -b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_1
c    -b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨  b^{1, 888}_0
c  in DIMACS:
-3821 -3822  3823 -887  3824 0
-3821 -3822  3823 -887 -3825 0
-3821 -3822  3823 -887  3826 0

c  -1+1 --> 0
c    ( b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0 ∧  p_887) -> (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧ -b^{1, 888}_0)
c  in CNF:
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_2
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_1
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_0
c  in DIMACS:
-3821  3822 -3823 -887 -3824 0
-3821  3822 -3823 -887 -3825 0
-3821  3822 -3823 -887 -3826 0

c  0+1 --> 1
c    (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧  p_887) -> (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0)
c  in CNF:
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_2
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_1
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨  b^{1, 888}_0
c  in DIMACS:
 3821  3822  3823 -887 -3824 0
 3821  3822  3823 -887 -3825 0
 3821  3822  3823 -887  3826 0

c  1+1 --> 2
c    (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0 ∧  p_887) -> (-b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0)
c  in CNF:
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_2
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨  b^{1, 888}_1
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ -p_887 ∨ -b^{1, 888}_0
c  in DIMACS:
 3821  3822 -3823 -887 -3824 0
 3821  3822 -3823 -887  3825 0
 3821  3822 -3823 -887 -3826 0

c  2+1 --> break 
c    (-b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧  p_887) -> break
c  in CNF:
c     b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ -p_887 ∨ break
c  in DIMACS:
 3821 -3822  3823 -887 1162 0


c  2-1 --> 1
c    (-b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧ -p_887) -> (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0)
c  in CNF:
c     b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_2
c     b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_1
c     b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨  b^{1, 888}_0
c  in DIMACS:
 3821 -3822  3823  887 -3824 0
 3821 -3822  3823  887 -3825 0
 3821 -3822  3823  887  3826 0

c  1-1 --> 0
c    (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0 ∧ -p_887) -> (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧ -b^{1, 888}_0)
c  in CNF:
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_2
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_1
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_0
c  in DIMACS:
 3821  3822 -3823  887 -3824 0
 3821  3822 -3823  887 -3825 0
 3821  3822 -3823  887 -3826 0

c  0-1 --> -1
c    (-b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧ -p_887) -> ( b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0)
c  in CNF:
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨  b^{1, 888}_2
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_1
c     b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨  b^{1, 888}_0
c  in DIMACS:
 3821  3822  3823  887  3824 0
 3821  3822  3823  887 -3825 0
 3821  3822  3823  887  3826 0

c  -1-1 --> -2
c    ( b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧  b^{1, 887}_0 ∧ -p_887) -> ( b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0)
c  in CNF:
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨  b^{1, 888}_2
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨  b^{1, 888}_1
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨  p_887 ∨ -b^{1, 888}_0
c  in DIMACS:
-3821  3822 -3823  887  3824 0
-3821  3822 -3823  887  3825 0
-3821  3822 -3823  887 -3826 0

c  -2-1 --> break 
c    ( b^{1, 887}_2 ∧  b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧ -p_887) -> break
c  in CNF:
c    -b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨  b^{1, 887}_0 ∨  p_887 ∨ break
c  in DIMACS:
-3821 -3822  3823  887 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 887}_2 ∧ -b^{1, 887}_1 ∧ -b^{1, 887}_0 ∧ true) 
c  in CNF:
c    -b^{1, 887}_2 ∨  b^{1, 887}_1 ∨  b^{1, 887}_0 ∨ false 
c  in DIMACS:
-3821  3822  3823  0

c  3 does not represent an automaton state.
c    -(-b^{1, 887}_2 ∧  b^{1, 887}_1 ∧  b^{1, 887}_0 ∧ true) 
c  in CNF:
c     b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ false 
c  in DIMACS:
 3821 -3822 -3823  0
c  -3 does not represent an automaton state.
c    -( b^{1, 887}_2 ∧  b^{1, 887}_1 ∧  b^{1, 887}_0 ∧ true) 
c  in CNF:
c    -b^{1, 887}_2 ∨ -b^{1, 887}_1 ∨ -b^{1, 887}_0 ∨ false 
c  in DIMACS:
-3821 -3822 -3823  0

c i = 888
c  -2+1 --> -1
c    ( b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧  p_888) -> ( b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0)
c  in CNF:
c    -b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨  b^{1, 889}_2
c    -b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_1
c    -b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨  b^{1, 889}_0
c  in DIMACS:
-3824 -3825  3826 -888  3827 0
-3824 -3825  3826 -888 -3828 0
-3824 -3825  3826 -888  3829 0

c  -1+1 --> 0
c    ( b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0 ∧  p_888) -> (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧ -b^{1, 889}_0)
c  in CNF:
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_2
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_1
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_0
c  in DIMACS:
-3824  3825 -3826 -888 -3827 0
-3824  3825 -3826 -888 -3828 0
-3824  3825 -3826 -888 -3829 0

c  0+1 --> 1
c    (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧  p_888) -> (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0)
c  in CNF:
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_2
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_1
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨  b^{1, 889}_0
c  in DIMACS:
 3824  3825  3826 -888 -3827 0
 3824  3825  3826 -888 -3828 0
 3824  3825  3826 -888  3829 0

c  1+1 --> 2
c    (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0 ∧  p_888) -> (-b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0)
c  in CNF:
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_2
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨  b^{1, 889}_1
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ -p_888 ∨ -b^{1, 889}_0
c  in DIMACS:
 3824  3825 -3826 -888 -3827 0
 3824  3825 -3826 -888  3828 0
 3824  3825 -3826 -888 -3829 0

c  2+1 --> break 
c    (-b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧  p_888) -> break
c  in CNF:
c     b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 3824 -3825  3826 -888 1162 0


c  2-1 --> 1
c    (-b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧ -p_888) -> (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0)
c  in CNF:
c     b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_2
c     b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_1
c     b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨  b^{1, 889}_0
c  in DIMACS:
 3824 -3825  3826  888 -3827 0
 3824 -3825  3826  888 -3828 0
 3824 -3825  3826  888  3829 0

c  1-1 --> 0
c    (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0 ∧ -p_888) -> (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧ -b^{1, 889}_0)
c  in CNF:
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_2
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_1
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_0
c  in DIMACS:
 3824  3825 -3826  888 -3827 0
 3824  3825 -3826  888 -3828 0
 3824  3825 -3826  888 -3829 0

c  0-1 --> -1
c    (-b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧ -p_888) -> ( b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0)
c  in CNF:
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨  b^{1, 889}_2
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_1
c     b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨  b^{1, 889}_0
c  in DIMACS:
 3824  3825  3826  888  3827 0
 3824  3825  3826  888 -3828 0
 3824  3825  3826  888  3829 0

c  -1-1 --> -2
c    ( b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧  b^{1, 888}_0 ∧ -p_888) -> ( b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0)
c  in CNF:
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨  b^{1, 889}_2
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨  b^{1, 889}_1
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨  p_888 ∨ -b^{1, 889}_0
c  in DIMACS:
-3824  3825 -3826  888  3827 0
-3824  3825 -3826  888  3828 0
-3824  3825 -3826  888 -3829 0

c  -2-1 --> break 
c    ( b^{1, 888}_2 ∧  b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨  b^{1, 888}_0 ∨  p_888 ∨ break
c  in DIMACS:
-3824 -3825  3826  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 888}_2 ∧ -b^{1, 888}_1 ∧ -b^{1, 888}_0 ∧ true) 
c  in CNF:
c    -b^{1, 888}_2 ∨  b^{1, 888}_1 ∨  b^{1, 888}_0 ∨ false 
c  in DIMACS:
-3824  3825  3826  0

c  3 does not represent an automaton state.
c    -(-b^{1, 888}_2 ∧  b^{1, 888}_1 ∧  b^{1, 888}_0 ∧ true) 
c  in CNF:
c     b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ false 
c  in DIMACS:
 3824 -3825 -3826  0
c  -3 does not represent an automaton state.
c    -( b^{1, 888}_2 ∧  b^{1, 888}_1 ∧  b^{1, 888}_0 ∧ true) 
c  in CNF:
c    -b^{1, 888}_2 ∨ -b^{1, 888}_1 ∨ -b^{1, 888}_0 ∨ false 
c  in DIMACS:
-3824 -3825 -3826  0

c i = 889
c  -2+1 --> -1
c    ( b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧  p_889) -> ( b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0)
c  in CNF:
c    -b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨  b^{1, 890}_2
c    -b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_1
c    -b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨  b^{1, 890}_0
c  in DIMACS:
-3827 -3828  3829 -889  3830 0
-3827 -3828  3829 -889 -3831 0
-3827 -3828  3829 -889  3832 0

c  -1+1 --> 0
c    ( b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0 ∧  p_889) -> (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧ -b^{1, 890}_0)
c  in CNF:
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_2
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_1
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_0
c  in DIMACS:
-3827  3828 -3829 -889 -3830 0
-3827  3828 -3829 -889 -3831 0
-3827  3828 -3829 -889 -3832 0

c  0+1 --> 1
c    (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧  p_889) -> (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0)
c  in CNF:
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_2
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_1
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨  b^{1, 890}_0
c  in DIMACS:
 3827  3828  3829 -889 -3830 0
 3827  3828  3829 -889 -3831 0
 3827  3828  3829 -889  3832 0

c  1+1 --> 2
c    (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0 ∧  p_889) -> (-b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0)
c  in CNF:
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_2
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨  b^{1, 890}_1
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ -p_889 ∨ -b^{1, 890}_0
c  in DIMACS:
 3827  3828 -3829 -889 -3830 0
 3827  3828 -3829 -889  3831 0
 3827  3828 -3829 -889 -3832 0

c  2+1 --> break 
c    (-b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧  p_889) -> break
c  in CNF:
c     b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ -p_889 ∨ break
c  in DIMACS:
 3827 -3828  3829 -889 1162 0


c  2-1 --> 1
c    (-b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧ -p_889) -> (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0)
c  in CNF:
c     b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_2
c     b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_1
c     b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨  b^{1, 890}_0
c  in DIMACS:
 3827 -3828  3829  889 -3830 0
 3827 -3828  3829  889 -3831 0
 3827 -3828  3829  889  3832 0

c  1-1 --> 0
c    (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0 ∧ -p_889) -> (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧ -b^{1, 890}_0)
c  in CNF:
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_2
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_1
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_0
c  in DIMACS:
 3827  3828 -3829  889 -3830 0
 3827  3828 -3829  889 -3831 0
 3827  3828 -3829  889 -3832 0

c  0-1 --> -1
c    (-b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧ -p_889) -> ( b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0)
c  in CNF:
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨  b^{1, 890}_2
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_1
c     b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨  b^{1, 890}_0
c  in DIMACS:
 3827  3828  3829  889  3830 0
 3827  3828  3829  889 -3831 0
 3827  3828  3829  889  3832 0

c  -1-1 --> -2
c    ( b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧  b^{1, 889}_0 ∧ -p_889) -> ( b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0)
c  in CNF:
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨  b^{1, 890}_2
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨  b^{1, 890}_1
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨  p_889 ∨ -b^{1, 890}_0
c  in DIMACS:
-3827  3828 -3829  889  3830 0
-3827  3828 -3829  889  3831 0
-3827  3828 -3829  889 -3832 0

c  -2-1 --> break 
c    ( b^{1, 889}_2 ∧  b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧ -p_889) -> break
c  in CNF:
c    -b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨  b^{1, 889}_0 ∨  p_889 ∨ break
c  in DIMACS:
-3827 -3828  3829  889 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 889}_2 ∧ -b^{1, 889}_1 ∧ -b^{1, 889}_0 ∧ true) 
c  in CNF:
c    -b^{1, 889}_2 ∨  b^{1, 889}_1 ∨  b^{1, 889}_0 ∨ false 
c  in DIMACS:
-3827  3828  3829  0

c  3 does not represent an automaton state.
c    -(-b^{1, 889}_2 ∧  b^{1, 889}_1 ∧  b^{1, 889}_0 ∧ true) 
c  in CNF:
c     b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ false 
c  in DIMACS:
 3827 -3828 -3829  0
c  -3 does not represent an automaton state.
c    -( b^{1, 889}_2 ∧  b^{1, 889}_1 ∧  b^{1, 889}_0 ∧ true) 
c  in CNF:
c    -b^{1, 889}_2 ∨ -b^{1, 889}_1 ∨ -b^{1, 889}_0 ∨ false 
c  in DIMACS:
-3827 -3828 -3829  0

c i = 890
c  -2+1 --> -1
c    ( b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧  p_890) -> ( b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0)
c  in CNF:
c    -b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨  b^{1, 891}_2
c    -b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_1
c    -b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨  b^{1, 891}_0
c  in DIMACS:
-3830 -3831  3832 -890  3833 0
-3830 -3831  3832 -890 -3834 0
-3830 -3831  3832 -890  3835 0

c  -1+1 --> 0
c    ( b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0 ∧  p_890) -> (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧ -b^{1, 891}_0)
c  in CNF:
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_2
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_1
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_0
c  in DIMACS:
-3830  3831 -3832 -890 -3833 0
-3830  3831 -3832 -890 -3834 0
-3830  3831 -3832 -890 -3835 0

c  0+1 --> 1
c    (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧  p_890) -> (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0)
c  in CNF:
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_2
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_1
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨  b^{1, 891}_0
c  in DIMACS:
 3830  3831  3832 -890 -3833 0
 3830  3831  3832 -890 -3834 0
 3830  3831  3832 -890  3835 0

c  1+1 --> 2
c    (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0 ∧  p_890) -> (-b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0)
c  in CNF:
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_2
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨  b^{1, 891}_1
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ -p_890 ∨ -b^{1, 891}_0
c  in DIMACS:
 3830  3831 -3832 -890 -3833 0
 3830  3831 -3832 -890  3834 0
 3830  3831 -3832 -890 -3835 0

c  2+1 --> break 
c    (-b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧  p_890) -> break
c  in CNF:
c     b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 3830 -3831  3832 -890 1162 0


c  2-1 --> 1
c    (-b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧ -p_890) -> (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0)
c  in CNF:
c     b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_2
c     b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_1
c     b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨  b^{1, 891}_0
c  in DIMACS:
 3830 -3831  3832  890 -3833 0
 3830 -3831  3832  890 -3834 0
 3830 -3831  3832  890  3835 0

c  1-1 --> 0
c    (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0 ∧ -p_890) -> (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧ -b^{1, 891}_0)
c  in CNF:
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_2
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_1
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_0
c  in DIMACS:
 3830  3831 -3832  890 -3833 0
 3830  3831 -3832  890 -3834 0
 3830  3831 -3832  890 -3835 0

c  0-1 --> -1
c    (-b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧ -p_890) -> ( b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0)
c  in CNF:
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨  b^{1, 891}_2
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_1
c     b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨  b^{1, 891}_0
c  in DIMACS:
 3830  3831  3832  890  3833 0
 3830  3831  3832  890 -3834 0
 3830  3831  3832  890  3835 0

c  -1-1 --> -2
c    ( b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧  b^{1, 890}_0 ∧ -p_890) -> ( b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0)
c  in CNF:
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨  b^{1, 891}_2
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨  b^{1, 891}_1
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨  p_890 ∨ -b^{1, 891}_0
c  in DIMACS:
-3830  3831 -3832  890  3833 0
-3830  3831 -3832  890  3834 0
-3830  3831 -3832  890 -3835 0

c  -2-1 --> break 
c    ( b^{1, 890}_2 ∧  b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨  b^{1, 890}_0 ∨  p_890 ∨ break
c  in DIMACS:
-3830 -3831  3832  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 890}_2 ∧ -b^{1, 890}_1 ∧ -b^{1, 890}_0 ∧ true) 
c  in CNF:
c    -b^{1, 890}_2 ∨  b^{1, 890}_1 ∨  b^{1, 890}_0 ∨ false 
c  in DIMACS:
-3830  3831  3832  0

c  3 does not represent an automaton state.
c    -(-b^{1, 890}_2 ∧  b^{1, 890}_1 ∧  b^{1, 890}_0 ∧ true) 
c  in CNF:
c     b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ false 
c  in DIMACS:
 3830 -3831 -3832  0
c  -3 does not represent an automaton state.
c    -( b^{1, 890}_2 ∧  b^{1, 890}_1 ∧  b^{1, 890}_0 ∧ true) 
c  in CNF:
c    -b^{1, 890}_2 ∨ -b^{1, 890}_1 ∨ -b^{1, 890}_0 ∨ false 
c  in DIMACS:
-3830 -3831 -3832  0

c i = 891
c  -2+1 --> -1
c    ( b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧  p_891) -> ( b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0)
c  in CNF:
c    -b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨  b^{1, 892}_2
c    -b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_1
c    -b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨  b^{1, 892}_0
c  in DIMACS:
-3833 -3834  3835 -891  3836 0
-3833 -3834  3835 -891 -3837 0
-3833 -3834  3835 -891  3838 0

c  -1+1 --> 0
c    ( b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0 ∧  p_891) -> (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧ -b^{1, 892}_0)
c  in CNF:
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_2
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_1
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_0
c  in DIMACS:
-3833  3834 -3835 -891 -3836 0
-3833  3834 -3835 -891 -3837 0
-3833  3834 -3835 -891 -3838 0

c  0+1 --> 1
c    (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧  p_891) -> (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0)
c  in CNF:
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_2
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_1
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨  b^{1, 892}_0
c  in DIMACS:
 3833  3834  3835 -891 -3836 0
 3833  3834  3835 -891 -3837 0
 3833  3834  3835 -891  3838 0

c  1+1 --> 2
c    (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0 ∧  p_891) -> (-b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0)
c  in CNF:
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_2
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨  b^{1, 892}_1
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ -p_891 ∨ -b^{1, 892}_0
c  in DIMACS:
 3833  3834 -3835 -891 -3836 0
 3833  3834 -3835 -891  3837 0
 3833  3834 -3835 -891 -3838 0

c  2+1 --> break 
c    (-b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧  p_891) -> break
c  in CNF:
c     b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 3833 -3834  3835 -891 1162 0


c  2-1 --> 1
c    (-b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧ -p_891) -> (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0)
c  in CNF:
c     b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_2
c     b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_1
c     b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨  b^{1, 892}_0
c  in DIMACS:
 3833 -3834  3835  891 -3836 0
 3833 -3834  3835  891 -3837 0
 3833 -3834  3835  891  3838 0

c  1-1 --> 0
c    (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0 ∧ -p_891) -> (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧ -b^{1, 892}_0)
c  in CNF:
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_2
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_1
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_0
c  in DIMACS:
 3833  3834 -3835  891 -3836 0
 3833  3834 -3835  891 -3837 0
 3833  3834 -3835  891 -3838 0

c  0-1 --> -1
c    (-b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧ -p_891) -> ( b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0)
c  in CNF:
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨  b^{1, 892}_2
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_1
c     b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨  b^{1, 892}_0
c  in DIMACS:
 3833  3834  3835  891  3836 0
 3833  3834  3835  891 -3837 0
 3833  3834  3835  891  3838 0

c  -1-1 --> -2
c    ( b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧  b^{1, 891}_0 ∧ -p_891) -> ( b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0)
c  in CNF:
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨  b^{1, 892}_2
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨  b^{1, 892}_1
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨  p_891 ∨ -b^{1, 892}_0
c  in DIMACS:
-3833  3834 -3835  891  3836 0
-3833  3834 -3835  891  3837 0
-3833  3834 -3835  891 -3838 0

c  -2-1 --> break 
c    ( b^{1, 891}_2 ∧  b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨  b^{1, 891}_0 ∨  p_891 ∨ break
c  in DIMACS:
-3833 -3834  3835  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 891}_2 ∧ -b^{1, 891}_1 ∧ -b^{1, 891}_0 ∧ true) 
c  in CNF:
c    -b^{1, 891}_2 ∨  b^{1, 891}_1 ∨  b^{1, 891}_0 ∨ false 
c  in DIMACS:
-3833  3834  3835  0

c  3 does not represent an automaton state.
c    -(-b^{1, 891}_2 ∧  b^{1, 891}_1 ∧  b^{1, 891}_0 ∧ true) 
c  in CNF:
c     b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ false 
c  in DIMACS:
 3833 -3834 -3835  0
c  -3 does not represent an automaton state.
c    -( b^{1, 891}_2 ∧  b^{1, 891}_1 ∧  b^{1, 891}_0 ∧ true) 
c  in CNF:
c    -b^{1, 891}_2 ∨ -b^{1, 891}_1 ∨ -b^{1, 891}_0 ∨ false 
c  in DIMACS:
-3833 -3834 -3835  0

c i = 892
c  -2+1 --> -1
c    ( b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧  p_892) -> ( b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0)
c  in CNF:
c    -b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨  b^{1, 893}_2
c    -b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_1
c    -b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨  b^{1, 893}_0
c  in DIMACS:
-3836 -3837  3838 -892  3839 0
-3836 -3837  3838 -892 -3840 0
-3836 -3837  3838 -892  3841 0

c  -1+1 --> 0
c    ( b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0 ∧  p_892) -> (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧ -b^{1, 893}_0)
c  in CNF:
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_2
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_1
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_0
c  in DIMACS:
-3836  3837 -3838 -892 -3839 0
-3836  3837 -3838 -892 -3840 0
-3836  3837 -3838 -892 -3841 0

c  0+1 --> 1
c    (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧  p_892) -> (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0)
c  in CNF:
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_2
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_1
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨  b^{1, 893}_0
c  in DIMACS:
 3836  3837  3838 -892 -3839 0
 3836  3837  3838 -892 -3840 0
 3836  3837  3838 -892  3841 0

c  1+1 --> 2
c    (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0 ∧  p_892) -> (-b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0)
c  in CNF:
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_2
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨  b^{1, 893}_1
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ -p_892 ∨ -b^{1, 893}_0
c  in DIMACS:
 3836  3837 -3838 -892 -3839 0
 3836  3837 -3838 -892  3840 0
 3836  3837 -3838 -892 -3841 0

c  2+1 --> break 
c    (-b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧  p_892) -> break
c  in CNF:
c     b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ -p_892 ∨ break
c  in DIMACS:
 3836 -3837  3838 -892 1162 0


c  2-1 --> 1
c    (-b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧ -p_892) -> (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0)
c  in CNF:
c     b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_2
c     b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_1
c     b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨  b^{1, 893}_0
c  in DIMACS:
 3836 -3837  3838  892 -3839 0
 3836 -3837  3838  892 -3840 0
 3836 -3837  3838  892  3841 0

c  1-1 --> 0
c    (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0 ∧ -p_892) -> (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧ -b^{1, 893}_0)
c  in CNF:
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_2
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_1
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_0
c  in DIMACS:
 3836  3837 -3838  892 -3839 0
 3836  3837 -3838  892 -3840 0
 3836  3837 -3838  892 -3841 0

c  0-1 --> -1
c    (-b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧ -p_892) -> ( b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0)
c  in CNF:
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨  b^{1, 893}_2
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_1
c     b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨  b^{1, 893}_0
c  in DIMACS:
 3836  3837  3838  892  3839 0
 3836  3837  3838  892 -3840 0
 3836  3837  3838  892  3841 0

c  -1-1 --> -2
c    ( b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧  b^{1, 892}_0 ∧ -p_892) -> ( b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0)
c  in CNF:
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨  b^{1, 893}_2
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨  b^{1, 893}_1
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨  p_892 ∨ -b^{1, 893}_0
c  in DIMACS:
-3836  3837 -3838  892  3839 0
-3836  3837 -3838  892  3840 0
-3836  3837 -3838  892 -3841 0

c  -2-1 --> break 
c    ( b^{1, 892}_2 ∧  b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧ -p_892) -> break
c  in CNF:
c    -b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨  b^{1, 892}_0 ∨  p_892 ∨ break
c  in DIMACS:
-3836 -3837  3838  892 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 892}_2 ∧ -b^{1, 892}_1 ∧ -b^{1, 892}_0 ∧ true) 
c  in CNF:
c    -b^{1, 892}_2 ∨  b^{1, 892}_1 ∨  b^{1, 892}_0 ∨ false 
c  in DIMACS:
-3836  3837  3838  0

c  3 does not represent an automaton state.
c    -(-b^{1, 892}_2 ∧  b^{1, 892}_1 ∧  b^{1, 892}_0 ∧ true) 
c  in CNF:
c     b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ false 
c  in DIMACS:
 3836 -3837 -3838  0
c  -3 does not represent an automaton state.
c    -( b^{1, 892}_2 ∧  b^{1, 892}_1 ∧  b^{1, 892}_0 ∧ true) 
c  in CNF:
c    -b^{1, 892}_2 ∨ -b^{1, 892}_1 ∨ -b^{1, 892}_0 ∨ false 
c  in DIMACS:
-3836 -3837 -3838  0

c i = 893
c  -2+1 --> -1
c    ( b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧  p_893) -> ( b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0)
c  in CNF:
c    -b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨  b^{1, 894}_2
c    -b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_1
c    -b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨  b^{1, 894}_0
c  in DIMACS:
-3839 -3840  3841 -893  3842 0
-3839 -3840  3841 -893 -3843 0
-3839 -3840  3841 -893  3844 0

c  -1+1 --> 0
c    ( b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0 ∧  p_893) -> (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧ -b^{1, 894}_0)
c  in CNF:
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_2
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_1
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_0
c  in DIMACS:
-3839  3840 -3841 -893 -3842 0
-3839  3840 -3841 -893 -3843 0
-3839  3840 -3841 -893 -3844 0

c  0+1 --> 1
c    (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧  p_893) -> (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0)
c  in CNF:
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_2
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_1
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨  b^{1, 894}_0
c  in DIMACS:
 3839  3840  3841 -893 -3842 0
 3839  3840  3841 -893 -3843 0
 3839  3840  3841 -893  3844 0

c  1+1 --> 2
c    (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0 ∧  p_893) -> (-b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0)
c  in CNF:
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_2
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨  b^{1, 894}_1
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ -p_893 ∨ -b^{1, 894}_0
c  in DIMACS:
 3839  3840 -3841 -893 -3842 0
 3839  3840 -3841 -893  3843 0
 3839  3840 -3841 -893 -3844 0

c  2+1 --> break 
c    (-b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧  p_893) -> break
c  in CNF:
c     b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ -p_893 ∨ break
c  in DIMACS:
 3839 -3840  3841 -893 1162 0


c  2-1 --> 1
c    (-b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧ -p_893) -> (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0)
c  in CNF:
c     b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_2
c     b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_1
c     b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨  b^{1, 894}_0
c  in DIMACS:
 3839 -3840  3841  893 -3842 0
 3839 -3840  3841  893 -3843 0
 3839 -3840  3841  893  3844 0

c  1-1 --> 0
c    (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0 ∧ -p_893) -> (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧ -b^{1, 894}_0)
c  in CNF:
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_2
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_1
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_0
c  in DIMACS:
 3839  3840 -3841  893 -3842 0
 3839  3840 -3841  893 -3843 0
 3839  3840 -3841  893 -3844 0

c  0-1 --> -1
c    (-b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧ -p_893) -> ( b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0)
c  in CNF:
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨  b^{1, 894}_2
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_1
c     b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨  b^{1, 894}_0
c  in DIMACS:
 3839  3840  3841  893  3842 0
 3839  3840  3841  893 -3843 0
 3839  3840  3841  893  3844 0

c  -1-1 --> -2
c    ( b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧  b^{1, 893}_0 ∧ -p_893) -> ( b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0)
c  in CNF:
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨  b^{1, 894}_2
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨  b^{1, 894}_1
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨  p_893 ∨ -b^{1, 894}_0
c  in DIMACS:
-3839  3840 -3841  893  3842 0
-3839  3840 -3841  893  3843 0
-3839  3840 -3841  893 -3844 0

c  -2-1 --> break 
c    ( b^{1, 893}_2 ∧  b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧ -p_893) -> break
c  in CNF:
c    -b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨  b^{1, 893}_0 ∨  p_893 ∨ break
c  in DIMACS:
-3839 -3840  3841  893 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 893}_2 ∧ -b^{1, 893}_1 ∧ -b^{1, 893}_0 ∧ true) 
c  in CNF:
c    -b^{1, 893}_2 ∨  b^{1, 893}_1 ∨  b^{1, 893}_0 ∨ false 
c  in DIMACS:
-3839  3840  3841  0

c  3 does not represent an automaton state.
c    -(-b^{1, 893}_2 ∧  b^{1, 893}_1 ∧  b^{1, 893}_0 ∧ true) 
c  in CNF:
c     b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ false 
c  in DIMACS:
 3839 -3840 -3841  0
c  -3 does not represent an automaton state.
c    -( b^{1, 893}_2 ∧  b^{1, 893}_1 ∧  b^{1, 893}_0 ∧ true) 
c  in CNF:
c    -b^{1, 893}_2 ∨ -b^{1, 893}_1 ∨ -b^{1, 893}_0 ∨ false 
c  in DIMACS:
-3839 -3840 -3841  0

c i = 894
c  -2+1 --> -1
c    ( b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧  p_894) -> ( b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0)
c  in CNF:
c    -b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨  b^{1, 895}_2
c    -b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_1
c    -b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨  b^{1, 895}_0
c  in DIMACS:
-3842 -3843  3844 -894  3845 0
-3842 -3843  3844 -894 -3846 0
-3842 -3843  3844 -894  3847 0

c  -1+1 --> 0
c    ( b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0 ∧  p_894) -> (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧ -b^{1, 895}_0)
c  in CNF:
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_2
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_1
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_0
c  in DIMACS:
-3842  3843 -3844 -894 -3845 0
-3842  3843 -3844 -894 -3846 0
-3842  3843 -3844 -894 -3847 0

c  0+1 --> 1
c    (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧  p_894) -> (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0)
c  in CNF:
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_2
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_1
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨  b^{1, 895}_0
c  in DIMACS:
 3842  3843  3844 -894 -3845 0
 3842  3843  3844 -894 -3846 0
 3842  3843  3844 -894  3847 0

c  1+1 --> 2
c    (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0 ∧  p_894) -> (-b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0)
c  in CNF:
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_2
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨  b^{1, 895}_1
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ -p_894 ∨ -b^{1, 895}_0
c  in DIMACS:
 3842  3843 -3844 -894 -3845 0
 3842  3843 -3844 -894  3846 0
 3842  3843 -3844 -894 -3847 0

c  2+1 --> break 
c    (-b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧  p_894) -> break
c  in CNF:
c     b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 3842 -3843  3844 -894 1162 0


c  2-1 --> 1
c    (-b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧ -p_894) -> (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0)
c  in CNF:
c     b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_2
c     b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_1
c     b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨  b^{1, 895}_0
c  in DIMACS:
 3842 -3843  3844  894 -3845 0
 3842 -3843  3844  894 -3846 0
 3842 -3843  3844  894  3847 0

c  1-1 --> 0
c    (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0 ∧ -p_894) -> (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧ -b^{1, 895}_0)
c  in CNF:
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_2
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_1
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_0
c  in DIMACS:
 3842  3843 -3844  894 -3845 0
 3842  3843 -3844  894 -3846 0
 3842  3843 -3844  894 -3847 0

c  0-1 --> -1
c    (-b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧ -p_894) -> ( b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0)
c  in CNF:
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨  b^{1, 895}_2
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_1
c     b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨  b^{1, 895}_0
c  in DIMACS:
 3842  3843  3844  894  3845 0
 3842  3843  3844  894 -3846 0
 3842  3843  3844  894  3847 0

c  -1-1 --> -2
c    ( b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧  b^{1, 894}_0 ∧ -p_894) -> ( b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0)
c  in CNF:
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨  b^{1, 895}_2
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨  b^{1, 895}_1
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨  p_894 ∨ -b^{1, 895}_0
c  in DIMACS:
-3842  3843 -3844  894  3845 0
-3842  3843 -3844  894  3846 0
-3842  3843 -3844  894 -3847 0

c  -2-1 --> break 
c    ( b^{1, 894}_2 ∧  b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨  b^{1, 894}_0 ∨  p_894 ∨ break
c  in DIMACS:
-3842 -3843  3844  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 894}_2 ∧ -b^{1, 894}_1 ∧ -b^{1, 894}_0 ∧ true) 
c  in CNF:
c    -b^{1, 894}_2 ∨  b^{1, 894}_1 ∨  b^{1, 894}_0 ∨ false 
c  in DIMACS:
-3842  3843  3844  0

c  3 does not represent an automaton state.
c    -(-b^{1, 894}_2 ∧  b^{1, 894}_1 ∧  b^{1, 894}_0 ∧ true) 
c  in CNF:
c     b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ false 
c  in DIMACS:
 3842 -3843 -3844  0
c  -3 does not represent an automaton state.
c    -( b^{1, 894}_2 ∧  b^{1, 894}_1 ∧  b^{1, 894}_0 ∧ true) 
c  in CNF:
c    -b^{1, 894}_2 ∨ -b^{1, 894}_1 ∨ -b^{1, 894}_0 ∨ false 
c  in DIMACS:
-3842 -3843 -3844  0

c i = 895
c  -2+1 --> -1
c    ( b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧  p_895) -> ( b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0)
c  in CNF:
c    -b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨  b^{1, 896}_2
c    -b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_1
c    -b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨  b^{1, 896}_0
c  in DIMACS:
-3845 -3846  3847 -895  3848 0
-3845 -3846  3847 -895 -3849 0
-3845 -3846  3847 -895  3850 0

c  -1+1 --> 0
c    ( b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0 ∧  p_895) -> (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧ -b^{1, 896}_0)
c  in CNF:
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_2
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_1
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_0
c  in DIMACS:
-3845  3846 -3847 -895 -3848 0
-3845  3846 -3847 -895 -3849 0
-3845  3846 -3847 -895 -3850 0

c  0+1 --> 1
c    (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧  p_895) -> (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0)
c  in CNF:
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_2
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_1
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨  b^{1, 896}_0
c  in DIMACS:
 3845  3846  3847 -895 -3848 0
 3845  3846  3847 -895 -3849 0
 3845  3846  3847 -895  3850 0

c  1+1 --> 2
c    (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0 ∧  p_895) -> (-b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0)
c  in CNF:
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_2
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨  b^{1, 896}_1
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ -p_895 ∨ -b^{1, 896}_0
c  in DIMACS:
 3845  3846 -3847 -895 -3848 0
 3845  3846 -3847 -895  3849 0
 3845  3846 -3847 -895 -3850 0

c  2+1 --> break 
c    (-b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧  p_895) -> break
c  in CNF:
c     b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ -p_895 ∨ break
c  in DIMACS:
 3845 -3846  3847 -895 1162 0


c  2-1 --> 1
c    (-b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧ -p_895) -> (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0)
c  in CNF:
c     b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_2
c     b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_1
c     b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨  b^{1, 896}_0
c  in DIMACS:
 3845 -3846  3847  895 -3848 0
 3845 -3846  3847  895 -3849 0
 3845 -3846  3847  895  3850 0

c  1-1 --> 0
c    (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0 ∧ -p_895) -> (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧ -b^{1, 896}_0)
c  in CNF:
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_2
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_1
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_0
c  in DIMACS:
 3845  3846 -3847  895 -3848 0
 3845  3846 -3847  895 -3849 0
 3845  3846 -3847  895 -3850 0

c  0-1 --> -1
c    (-b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧ -p_895) -> ( b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0)
c  in CNF:
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨  b^{1, 896}_2
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_1
c     b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨  b^{1, 896}_0
c  in DIMACS:
 3845  3846  3847  895  3848 0
 3845  3846  3847  895 -3849 0
 3845  3846  3847  895  3850 0

c  -1-1 --> -2
c    ( b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧  b^{1, 895}_0 ∧ -p_895) -> ( b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0)
c  in CNF:
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨  b^{1, 896}_2
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨  b^{1, 896}_1
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨  p_895 ∨ -b^{1, 896}_0
c  in DIMACS:
-3845  3846 -3847  895  3848 0
-3845  3846 -3847  895  3849 0
-3845  3846 -3847  895 -3850 0

c  -2-1 --> break 
c    ( b^{1, 895}_2 ∧  b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧ -p_895) -> break
c  in CNF:
c    -b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨  b^{1, 895}_0 ∨  p_895 ∨ break
c  in DIMACS:
-3845 -3846  3847  895 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 895}_2 ∧ -b^{1, 895}_1 ∧ -b^{1, 895}_0 ∧ true) 
c  in CNF:
c    -b^{1, 895}_2 ∨  b^{1, 895}_1 ∨  b^{1, 895}_0 ∨ false 
c  in DIMACS:
-3845  3846  3847  0

c  3 does not represent an automaton state.
c    -(-b^{1, 895}_2 ∧  b^{1, 895}_1 ∧  b^{1, 895}_0 ∧ true) 
c  in CNF:
c     b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ false 
c  in DIMACS:
 3845 -3846 -3847  0
c  -3 does not represent an automaton state.
c    -( b^{1, 895}_2 ∧  b^{1, 895}_1 ∧  b^{1, 895}_0 ∧ true) 
c  in CNF:
c    -b^{1, 895}_2 ∨ -b^{1, 895}_1 ∨ -b^{1, 895}_0 ∨ false 
c  in DIMACS:
-3845 -3846 -3847  0

c i = 896
c  -2+1 --> -1
c    ( b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧  p_896) -> ( b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0)
c  in CNF:
c    -b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨  b^{1, 897}_2
c    -b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_1
c    -b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨  b^{1, 897}_0
c  in DIMACS:
-3848 -3849  3850 -896  3851 0
-3848 -3849  3850 -896 -3852 0
-3848 -3849  3850 -896  3853 0

c  -1+1 --> 0
c    ( b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0 ∧  p_896) -> (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧ -b^{1, 897}_0)
c  in CNF:
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_2
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_1
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_0
c  in DIMACS:
-3848  3849 -3850 -896 -3851 0
-3848  3849 -3850 -896 -3852 0
-3848  3849 -3850 -896 -3853 0

c  0+1 --> 1
c    (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧  p_896) -> (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0)
c  in CNF:
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_2
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_1
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨  b^{1, 897}_0
c  in DIMACS:
 3848  3849  3850 -896 -3851 0
 3848  3849  3850 -896 -3852 0
 3848  3849  3850 -896  3853 0

c  1+1 --> 2
c    (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0 ∧  p_896) -> (-b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0)
c  in CNF:
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_2
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨  b^{1, 897}_1
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ -p_896 ∨ -b^{1, 897}_0
c  in DIMACS:
 3848  3849 -3850 -896 -3851 0
 3848  3849 -3850 -896  3852 0
 3848  3849 -3850 -896 -3853 0

c  2+1 --> break 
c    (-b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧  p_896) -> break
c  in CNF:
c     b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 3848 -3849  3850 -896 1162 0


c  2-1 --> 1
c    (-b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧ -p_896) -> (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0)
c  in CNF:
c     b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_2
c     b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_1
c     b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨  b^{1, 897}_0
c  in DIMACS:
 3848 -3849  3850  896 -3851 0
 3848 -3849  3850  896 -3852 0
 3848 -3849  3850  896  3853 0

c  1-1 --> 0
c    (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0 ∧ -p_896) -> (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧ -b^{1, 897}_0)
c  in CNF:
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_2
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_1
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_0
c  in DIMACS:
 3848  3849 -3850  896 -3851 0
 3848  3849 -3850  896 -3852 0
 3848  3849 -3850  896 -3853 0

c  0-1 --> -1
c    (-b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧ -p_896) -> ( b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0)
c  in CNF:
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨  b^{1, 897}_2
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_1
c     b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨  b^{1, 897}_0
c  in DIMACS:
 3848  3849  3850  896  3851 0
 3848  3849  3850  896 -3852 0
 3848  3849  3850  896  3853 0

c  -1-1 --> -2
c    ( b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧  b^{1, 896}_0 ∧ -p_896) -> ( b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0)
c  in CNF:
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨  b^{1, 897}_2
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨  b^{1, 897}_1
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨  p_896 ∨ -b^{1, 897}_0
c  in DIMACS:
-3848  3849 -3850  896  3851 0
-3848  3849 -3850  896  3852 0
-3848  3849 -3850  896 -3853 0

c  -2-1 --> break 
c    ( b^{1, 896}_2 ∧  b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨  b^{1, 896}_0 ∨  p_896 ∨ break
c  in DIMACS:
-3848 -3849  3850  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 896}_2 ∧ -b^{1, 896}_1 ∧ -b^{1, 896}_0 ∧ true) 
c  in CNF:
c    -b^{1, 896}_2 ∨  b^{1, 896}_1 ∨  b^{1, 896}_0 ∨ false 
c  in DIMACS:
-3848  3849  3850  0

c  3 does not represent an automaton state.
c    -(-b^{1, 896}_2 ∧  b^{1, 896}_1 ∧  b^{1, 896}_0 ∧ true) 
c  in CNF:
c     b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ false 
c  in DIMACS:
 3848 -3849 -3850  0
c  -3 does not represent an automaton state.
c    -( b^{1, 896}_2 ∧  b^{1, 896}_1 ∧  b^{1, 896}_0 ∧ true) 
c  in CNF:
c    -b^{1, 896}_2 ∨ -b^{1, 896}_1 ∨ -b^{1, 896}_0 ∨ false 
c  in DIMACS:
-3848 -3849 -3850  0

c i = 897
c  -2+1 --> -1
c    ( b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧  p_897) -> ( b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0)
c  in CNF:
c    -b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨  b^{1, 898}_2
c    -b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_1
c    -b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨  b^{1, 898}_0
c  in DIMACS:
-3851 -3852  3853 -897  3854 0
-3851 -3852  3853 -897 -3855 0
-3851 -3852  3853 -897  3856 0

c  -1+1 --> 0
c    ( b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0 ∧  p_897) -> (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧ -b^{1, 898}_0)
c  in CNF:
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_2
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_1
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_0
c  in DIMACS:
-3851  3852 -3853 -897 -3854 0
-3851  3852 -3853 -897 -3855 0
-3851  3852 -3853 -897 -3856 0

c  0+1 --> 1
c    (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧  p_897) -> (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0)
c  in CNF:
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_2
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_1
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨  b^{1, 898}_0
c  in DIMACS:
 3851  3852  3853 -897 -3854 0
 3851  3852  3853 -897 -3855 0
 3851  3852  3853 -897  3856 0

c  1+1 --> 2
c    (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0 ∧  p_897) -> (-b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0)
c  in CNF:
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_2
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨  b^{1, 898}_1
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ -p_897 ∨ -b^{1, 898}_0
c  in DIMACS:
 3851  3852 -3853 -897 -3854 0
 3851  3852 -3853 -897  3855 0
 3851  3852 -3853 -897 -3856 0

c  2+1 --> break 
c    (-b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧  p_897) -> break
c  in CNF:
c     b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 3851 -3852  3853 -897 1162 0


c  2-1 --> 1
c    (-b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧ -p_897) -> (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0)
c  in CNF:
c     b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_2
c     b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_1
c     b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨  b^{1, 898}_0
c  in DIMACS:
 3851 -3852  3853  897 -3854 0
 3851 -3852  3853  897 -3855 0
 3851 -3852  3853  897  3856 0

c  1-1 --> 0
c    (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0 ∧ -p_897) -> (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧ -b^{1, 898}_0)
c  in CNF:
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_2
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_1
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_0
c  in DIMACS:
 3851  3852 -3853  897 -3854 0
 3851  3852 -3853  897 -3855 0
 3851  3852 -3853  897 -3856 0

c  0-1 --> -1
c    (-b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧ -p_897) -> ( b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0)
c  in CNF:
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨  b^{1, 898}_2
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_1
c     b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨  b^{1, 898}_0
c  in DIMACS:
 3851  3852  3853  897  3854 0
 3851  3852  3853  897 -3855 0
 3851  3852  3853  897  3856 0

c  -1-1 --> -2
c    ( b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧  b^{1, 897}_0 ∧ -p_897) -> ( b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0)
c  in CNF:
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨  b^{1, 898}_2
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨  b^{1, 898}_1
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨  p_897 ∨ -b^{1, 898}_0
c  in DIMACS:
-3851  3852 -3853  897  3854 0
-3851  3852 -3853  897  3855 0
-3851  3852 -3853  897 -3856 0

c  -2-1 --> break 
c    ( b^{1, 897}_2 ∧  b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨  b^{1, 897}_0 ∨  p_897 ∨ break
c  in DIMACS:
-3851 -3852  3853  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 897}_2 ∧ -b^{1, 897}_1 ∧ -b^{1, 897}_0 ∧ true) 
c  in CNF:
c    -b^{1, 897}_2 ∨  b^{1, 897}_1 ∨  b^{1, 897}_0 ∨ false 
c  in DIMACS:
-3851  3852  3853  0

c  3 does not represent an automaton state.
c    -(-b^{1, 897}_2 ∧  b^{1, 897}_1 ∧  b^{1, 897}_0 ∧ true) 
c  in CNF:
c     b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ false 
c  in DIMACS:
 3851 -3852 -3853  0
c  -3 does not represent an automaton state.
c    -( b^{1, 897}_2 ∧  b^{1, 897}_1 ∧  b^{1, 897}_0 ∧ true) 
c  in CNF:
c    -b^{1, 897}_2 ∨ -b^{1, 897}_1 ∨ -b^{1, 897}_0 ∨ false 
c  in DIMACS:
-3851 -3852 -3853  0

c i = 898
c  -2+1 --> -1
c    ( b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧  p_898) -> ( b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0)
c  in CNF:
c    -b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨  b^{1, 899}_2
c    -b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_1
c    -b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨  b^{1, 899}_0
c  in DIMACS:
-3854 -3855  3856 -898  3857 0
-3854 -3855  3856 -898 -3858 0
-3854 -3855  3856 -898  3859 0

c  -1+1 --> 0
c    ( b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0 ∧  p_898) -> (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧ -b^{1, 899}_0)
c  in CNF:
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_2
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_1
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_0
c  in DIMACS:
-3854  3855 -3856 -898 -3857 0
-3854  3855 -3856 -898 -3858 0
-3854  3855 -3856 -898 -3859 0

c  0+1 --> 1
c    (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧  p_898) -> (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0)
c  in CNF:
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_2
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_1
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨  b^{1, 899}_0
c  in DIMACS:
 3854  3855  3856 -898 -3857 0
 3854  3855  3856 -898 -3858 0
 3854  3855  3856 -898  3859 0

c  1+1 --> 2
c    (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0 ∧  p_898) -> (-b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0)
c  in CNF:
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_2
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨  b^{1, 899}_1
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ -p_898 ∨ -b^{1, 899}_0
c  in DIMACS:
 3854  3855 -3856 -898 -3857 0
 3854  3855 -3856 -898  3858 0
 3854  3855 -3856 -898 -3859 0

c  2+1 --> break 
c    (-b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧  p_898) -> break
c  in CNF:
c     b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ -p_898 ∨ break
c  in DIMACS:
 3854 -3855  3856 -898 1162 0


c  2-1 --> 1
c    (-b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧ -p_898) -> (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0)
c  in CNF:
c     b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_2
c     b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_1
c     b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨  b^{1, 899}_0
c  in DIMACS:
 3854 -3855  3856  898 -3857 0
 3854 -3855  3856  898 -3858 0
 3854 -3855  3856  898  3859 0

c  1-1 --> 0
c    (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0 ∧ -p_898) -> (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧ -b^{1, 899}_0)
c  in CNF:
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_2
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_1
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_0
c  in DIMACS:
 3854  3855 -3856  898 -3857 0
 3854  3855 -3856  898 -3858 0
 3854  3855 -3856  898 -3859 0

c  0-1 --> -1
c    (-b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧ -p_898) -> ( b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0)
c  in CNF:
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨  b^{1, 899}_2
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_1
c     b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨  b^{1, 899}_0
c  in DIMACS:
 3854  3855  3856  898  3857 0
 3854  3855  3856  898 -3858 0
 3854  3855  3856  898  3859 0

c  -1-1 --> -2
c    ( b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧  b^{1, 898}_0 ∧ -p_898) -> ( b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0)
c  in CNF:
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨  b^{1, 899}_2
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨  b^{1, 899}_1
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨  p_898 ∨ -b^{1, 899}_0
c  in DIMACS:
-3854  3855 -3856  898  3857 0
-3854  3855 -3856  898  3858 0
-3854  3855 -3856  898 -3859 0

c  -2-1 --> break 
c    ( b^{1, 898}_2 ∧  b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧ -p_898) -> break
c  in CNF:
c    -b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨  b^{1, 898}_0 ∨  p_898 ∨ break
c  in DIMACS:
-3854 -3855  3856  898 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 898}_2 ∧ -b^{1, 898}_1 ∧ -b^{1, 898}_0 ∧ true) 
c  in CNF:
c    -b^{1, 898}_2 ∨  b^{1, 898}_1 ∨  b^{1, 898}_0 ∨ false 
c  in DIMACS:
-3854  3855  3856  0

c  3 does not represent an automaton state.
c    -(-b^{1, 898}_2 ∧  b^{1, 898}_1 ∧  b^{1, 898}_0 ∧ true) 
c  in CNF:
c     b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ false 
c  in DIMACS:
 3854 -3855 -3856  0
c  -3 does not represent an automaton state.
c    -( b^{1, 898}_2 ∧  b^{1, 898}_1 ∧  b^{1, 898}_0 ∧ true) 
c  in CNF:
c    -b^{1, 898}_2 ∨ -b^{1, 898}_1 ∨ -b^{1, 898}_0 ∨ false 
c  in DIMACS:
-3854 -3855 -3856  0

c i = 899
c  -2+1 --> -1
c    ( b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧  p_899) -> ( b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0)
c  in CNF:
c    -b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨  b^{1, 900}_2
c    -b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_1
c    -b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨  b^{1, 900}_0
c  in DIMACS:
-3857 -3858  3859 -899  3860 0
-3857 -3858  3859 -899 -3861 0
-3857 -3858  3859 -899  3862 0

c  -1+1 --> 0
c    ( b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0 ∧  p_899) -> (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧ -b^{1, 900}_0)
c  in CNF:
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_2
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_1
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_0
c  in DIMACS:
-3857  3858 -3859 -899 -3860 0
-3857  3858 -3859 -899 -3861 0
-3857  3858 -3859 -899 -3862 0

c  0+1 --> 1
c    (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧  p_899) -> (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0)
c  in CNF:
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_2
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_1
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨  b^{1, 900}_0
c  in DIMACS:
 3857  3858  3859 -899 -3860 0
 3857  3858  3859 -899 -3861 0
 3857  3858  3859 -899  3862 0

c  1+1 --> 2
c    (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0 ∧  p_899) -> (-b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0)
c  in CNF:
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_2
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨  b^{1, 900}_1
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ -p_899 ∨ -b^{1, 900}_0
c  in DIMACS:
 3857  3858 -3859 -899 -3860 0
 3857  3858 -3859 -899  3861 0
 3857  3858 -3859 -899 -3862 0

c  2+1 --> break 
c    (-b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧  p_899) -> break
c  in CNF:
c     b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ -p_899 ∨ break
c  in DIMACS:
 3857 -3858  3859 -899 1162 0


c  2-1 --> 1
c    (-b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧ -p_899) -> (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0)
c  in CNF:
c     b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_2
c     b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_1
c     b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨  b^{1, 900}_0
c  in DIMACS:
 3857 -3858  3859  899 -3860 0
 3857 -3858  3859  899 -3861 0
 3857 -3858  3859  899  3862 0

c  1-1 --> 0
c    (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0 ∧ -p_899) -> (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧ -b^{1, 900}_0)
c  in CNF:
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_2
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_1
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_0
c  in DIMACS:
 3857  3858 -3859  899 -3860 0
 3857  3858 -3859  899 -3861 0
 3857  3858 -3859  899 -3862 0

c  0-1 --> -1
c    (-b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧ -p_899) -> ( b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0)
c  in CNF:
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨  b^{1, 900}_2
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_1
c     b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨  b^{1, 900}_0
c  in DIMACS:
 3857  3858  3859  899  3860 0
 3857  3858  3859  899 -3861 0
 3857  3858  3859  899  3862 0

c  -1-1 --> -2
c    ( b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧  b^{1, 899}_0 ∧ -p_899) -> ( b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0)
c  in CNF:
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨  b^{1, 900}_2
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨  b^{1, 900}_1
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨  p_899 ∨ -b^{1, 900}_0
c  in DIMACS:
-3857  3858 -3859  899  3860 0
-3857  3858 -3859  899  3861 0
-3857  3858 -3859  899 -3862 0

c  -2-1 --> break 
c    ( b^{1, 899}_2 ∧  b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧ -p_899) -> break
c  in CNF:
c    -b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨  b^{1, 899}_0 ∨  p_899 ∨ break
c  in DIMACS:
-3857 -3858  3859  899 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 899}_2 ∧ -b^{1, 899}_1 ∧ -b^{1, 899}_0 ∧ true) 
c  in CNF:
c    -b^{1, 899}_2 ∨  b^{1, 899}_1 ∨  b^{1, 899}_0 ∨ false 
c  in DIMACS:
-3857  3858  3859  0

c  3 does not represent an automaton state.
c    -(-b^{1, 899}_2 ∧  b^{1, 899}_1 ∧  b^{1, 899}_0 ∧ true) 
c  in CNF:
c     b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ false 
c  in DIMACS:
 3857 -3858 -3859  0
c  -3 does not represent an automaton state.
c    -( b^{1, 899}_2 ∧  b^{1, 899}_1 ∧  b^{1, 899}_0 ∧ true) 
c  in CNF:
c    -b^{1, 899}_2 ∨ -b^{1, 899}_1 ∨ -b^{1, 899}_0 ∨ false 
c  in DIMACS:
-3857 -3858 -3859  0

c i = 900
c  -2+1 --> -1
c    ( b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧  p_900) -> ( b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0)
c  in CNF:
c    -b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨  b^{1, 901}_2
c    -b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_1
c    -b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨  b^{1, 901}_0
c  in DIMACS:
-3860 -3861  3862 -900  3863 0
-3860 -3861  3862 -900 -3864 0
-3860 -3861  3862 -900  3865 0

c  -1+1 --> 0
c    ( b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0 ∧  p_900) -> (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧ -b^{1, 901}_0)
c  in CNF:
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_2
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_1
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_0
c  in DIMACS:
-3860  3861 -3862 -900 -3863 0
-3860  3861 -3862 -900 -3864 0
-3860  3861 -3862 -900 -3865 0

c  0+1 --> 1
c    (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧  p_900) -> (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0)
c  in CNF:
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_2
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_1
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨  b^{1, 901}_0
c  in DIMACS:
 3860  3861  3862 -900 -3863 0
 3860  3861  3862 -900 -3864 0
 3860  3861  3862 -900  3865 0

c  1+1 --> 2
c    (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0 ∧  p_900) -> (-b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0)
c  in CNF:
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_2
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨  b^{1, 901}_1
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ -p_900 ∨ -b^{1, 901}_0
c  in DIMACS:
 3860  3861 -3862 -900 -3863 0
 3860  3861 -3862 -900  3864 0
 3860  3861 -3862 -900 -3865 0

c  2+1 --> break 
c    (-b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧  p_900) -> break
c  in CNF:
c     b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 3860 -3861  3862 -900 1162 0


c  2-1 --> 1
c    (-b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧ -p_900) -> (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0)
c  in CNF:
c     b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_2
c     b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_1
c     b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨  b^{1, 901}_0
c  in DIMACS:
 3860 -3861  3862  900 -3863 0
 3860 -3861  3862  900 -3864 0
 3860 -3861  3862  900  3865 0

c  1-1 --> 0
c    (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0 ∧ -p_900) -> (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧ -b^{1, 901}_0)
c  in CNF:
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_2
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_1
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_0
c  in DIMACS:
 3860  3861 -3862  900 -3863 0
 3860  3861 -3862  900 -3864 0
 3860  3861 -3862  900 -3865 0

c  0-1 --> -1
c    (-b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧ -p_900) -> ( b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0)
c  in CNF:
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨  b^{1, 901}_2
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_1
c     b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨  b^{1, 901}_0
c  in DIMACS:
 3860  3861  3862  900  3863 0
 3860  3861  3862  900 -3864 0
 3860  3861  3862  900  3865 0

c  -1-1 --> -2
c    ( b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧  b^{1, 900}_0 ∧ -p_900) -> ( b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0)
c  in CNF:
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨  b^{1, 901}_2
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨  b^{1, 901}_1
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨  p_900 ∨ -b^{1, 901}_0
c  in DIMACS:
-3860  3861 -3862  900  3863 0
-3860  3861 -3862  900  3864 0
-3860  3861 -3862  900 -3865 0

c  -2-1 --> break 
c    ( b^{1, 900}_2 ∧  b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨  b^{1, 900}_0 ∨  p_900 ∨ break
c  in DIMACS:
-3860 -3861  3862  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 900}_2 ∧ -b^{1, 900}_1 ∧ -b^{1, 900}_0 ∧ true) 
c  in CNF:
c    -b^{1, 900}_2 ∨  b^{1, 900}_1 ∨  b^{1, 900}_0 ∨ false 
c  in DIMACS:
-3860  3861  3862  0

c  3 does not represent an automaton state.
c    -(-b^{1, 900}_2 ∧  b^{1, 900}_1 ∧  b^{1, 900}_0 ∧ true) 
c  in CNF:
c     b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ false 
c  in DIMACS:
 3860 -3861 -3862  0
c  -3 does not represent an automaton state.
c    -( b^{1, 900}_2 ∧  b^{1, 900}_1 ∧  b^{1, 900}_0 ∧ true) 
c  in CNF:
c    -b^{1, 900}_2 ∨ -b^{1, 900}_1 ∨ -b^{1, 900}_0 ∨ false 
c  in DIMACS:
-3860 -3861 -3862  0

c i = 901
c  -2+1 --> -1
c    ( b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧  p_901) -> ( b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0)
c  in CNF:
c    -b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨  b^{1, 902}_2
c    -b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_1
c    -b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨  b^{1, 902}_0
c  in DIMACS:
-3863 -3864  3865 -901  3866 0
-3863 -3864  3865 -901 -3867 0
-3863 -3864  3865 -901  3868 0

c  -1+1 --> 0
c    ( b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0 ∧  p_901) -> (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧ -b^{1, 902}_0)
c  in CNF:
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_2
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_1
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_0
c  in DIMACS:
-3863  3864 -3865 -901 -3866 0
-3863  3864 -3865 -901 -3867 0
-3863  3864 -3865 -901 -3868 0

c  0+1 --> 1
c    (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧  p_901) -> (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0)
c  in CNF:
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_2
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_1
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨  b^{1, 902}_0
c  in DIMACS:
 3863  3864  3865 -901 -3866 0
 3863  3864  3865 -901 -3867 0
 3863  3864  3865 -901  3868 0

c  1+1 --> 2
c    (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0 ∧  p_901) -> (-b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0)
c  in CNF:
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_2
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨  b^{1, 902}_1
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ -p_901 ∨ -b^{1, 902}_0
c  in DIMACS:
 3863  3864 -3865 -901 -3866 0
 3863  3864 -3865 -901  3867 0
 3863  3864 -3865 -901 -3868 0

c  2+1 --> break 
c    (-b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧  p_901) -> break
c  in CNF:
c     b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ -p_901 ∨ break
c  in DIMACS:
 3863 -3864  3865 -901 1162 0


c  2-1 --> 1
c    (-b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧ -p_901) -> (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0)
c  in CNF:
c     b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_2
c     b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_1
c     b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨  b^{1, 902}_0
c  in DIMACS:
 3863 -3864  3865  901 -3866 0
 3863 -3864  3865  901 -3867 0
 3863 -3864  3865  901  3868 0

c  1-1 --> 0
c    (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0 ∧ -p_901) -> (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧ -b^{1, 902}_0)
c  in CNF:
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_2
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_1
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_0
c  in DIMACS:
 3863  3864 -3865  901 -3866 0
 3863  3864 -3865  901 -3867 0
 3863  3864 -3865  901 -3868 0

c  0-1 --> -1
c    (-b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧ -p_901) -> ( b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0)
c  in CNF:
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨  b^{1, 902}_2
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_1
c     b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨  b^{1, 902}_0
c  in DIMACS:
 3863  3864  3865  901  3866 0
 3863  3864  3865  901 -3867 0
 3863  3864  3865  901  3868 0

c  -1-1 --> -2
c    ( b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧  b^{1, 901}_0 ∧ -p_901) -> ( b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0)
c  in CNF:
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨  b^{1, 902}_2
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨  b^{1, 902}_1
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨  p_901 ∨ -b^{1, 902}_0
c  in DIMACS:
-3863  3864 -3865  901  3866 0
-3863  3864 -3865  901  3867 0
-3863  3864 -3865  901 -3868 0

c  -2-1 --> break 
c    ( b^{1, 901}_2 ∧  b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧ -p_901) -> break
c  in CNF:
c    -b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨  b^{1, 901}_0 ∨  p_901 ∨ break
c  in DIMACS:
-3863 -3864  3865  901 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 901}_2 ∧ -b^{1, 901}_1 ∧ -b^{1, 901}_0 ∧ true) 
c  in CNF:
c    -b^{1, 901}_2 ∨  b^{1, 901}_1 ∨  b^{1, 901}_0 ∨ false 
c  in DIMACS:
-3863  3864  3865  0

c  3 does not represent an automaton state.
c    -(-b^{1, 901}_2 ∧  b^{1, 901}_1 ∧  b^{1, 901}_0 ∧ true) 
c  in CNF:
c     b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ false 
c  in DIMACS:
 3863 -3864 -3865  0
c  -3 does not represent an automaton state.
c    -( b^{1, 901}_2 ∧  b^{1, 901}_1 ∧  b^{1, 901}_0 ∧ true) 
c  in CNF:
c    -b^{1, 901}_2 ∨ -b^{1, 901}_1 ∨ -b^{1, 901}_0 ∨ false 
c  in DIMACS:
-3863 -3864 -3865  0

c i = 902
c  -2+1 --> -1
c    ( b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧  p_902) -> ( b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0)
c  in CNF:
c    -b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨  b^{1, 903}_2
c    -b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_1
c    -b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨  b^{1, 903}_0
c  in DIMACS:
-3866 -3867  3868 -902  3869 0
-3866 -3867  3868 -902 -3870 0
-3866 -3867  3868 -902  3871 0

c  -1+1 --> 0
c    ( b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0 ∧  p_902) -> (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧ -b^{1, 903}_0)
c  in CNF:
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_2
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_1
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_0
c  in DIMACS:
-3866  3867 -3868 -902 -3869 0
-3866  3867 -3868 -902 -3870 0
-3866  3867 -3868 -902 -3871 0

c  0+1 --> 1
c    (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧  p_902) -> (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0)
c  in CNF:
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_2
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_1
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨  b^{1, 903}_0
c  in DIMACS:
 3866  3867  3868 -902 -3869 0
 3866  3867  3868 -902 -3870 0
 3866  3867  3868 -902  3871 0

c  1+1 --> 2
c    (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0 ∧  p_902) -> (-b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0)
c  in CNF:
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_2
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨  b^{1, 903}_1
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ -p_902 ∨ -b^{1, 903}_0
c  in DIMACS:
 3866  3867 -3868 -902 -3869 0
 3866  3867 -3868 -902  3870 0
 3866  3867 -3868 -902 -3871 0

c  2+1 --> break 
c    (-b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧  p_902) -> break
c  in CNF:
c     b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 3866 -3867  3868 -902 1162 0


c  2-1 --> 1
c    (-b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧ -p_902) -> (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0)
c  in CNF:
c     b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_2
c     b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_1
c     b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨  b^{1, 903}_0
c  in DIMACS:
 3866 -3867  3868  902 -3869 0
 3866 -3867  3868  902 -3870 0
 3866 -3867  3868  902  3871 0

c  1-1 --> 0
c    (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0 ∧ -p_902) -> (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧ -b^{1, 903}_0)
c  in CNF:
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_2
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_1
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_0
c  in DIMACS:
 3866  3867 -3868  902 -3869 0
 3866  3867 -3868  902 -3870 0
 3866  3867 -3868  902 -3871 0

c  0-1 --> -1
c    (-b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧ -p_902) -> ( b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0)
c  in CNF:
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨  b^{1, 903}_2
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_1
c     b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨  b^{1, 903}_0
c  in DIMACS:
 3866  3867  3868  902  3869 0
 3866  3867  3868  902 -3870 0
 3866  3867  3868  902  3871 0

c  -1-1 --> -2
c    ( b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧  b^{1, 902}_0 ∧ -p_902) -> ( b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0)
c  in CNF:
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨  b^{1, 903}_2
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨  b^{1, 903}_1
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨  p_902 ∨ -b^{1, 903}_0
c  in DIMACS:
-3866  3867 -3868  902  3869 0
-3866  3867 -3868  902  3870 0
-3866  3867 -3868  902 -3871 0

c  -2-1 --> break 
c    ( b^{1, 902}_2 ∧  b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨  b^{1, 902}_0 ∨  p_902 ∨ break
c  in DIMACS:
-3866 -3867  3868  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 902}_2 ∧ -b^{1, 902}_1 ∧ -b^{1, 902}_0 ∧ true) 
c  in CNF:
c    -b^{1, 902}_2 ∨  b^{1, 902}_1 ∨  b^{1, 902}_0 ∨ false 
c  in DIMACS:
-3866  3867  3868  0

c  3 does not represent an automaton state.
c    -(-b^{1, 902}_2 ∧  b^{1, 902}_1 ∧  b^{1, 902}_0 ∧ true) 
c  in CNF:
c     b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ false 
c  in DIMACS:
 3866 -3867 -3868  0
c  -3 does not represent an automaton state.
c    -( b^{1, 902}_2 ∧  b^{1, 902}_1 ∧  b^{1, 902}_0 ∧ true) 
c  in CNF:
c    -b^{1, 902}_2 ∨ -b^{1, 902}_1 ∨ -b^{1, 902}_0 ∨ false 
c  in DIMACS:
-3866 -3867 -3868  0

c i = 903
c  -2+1 --> -1
c    ( b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧  p_903) -> ( b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0)
c  in CNF:
c    -b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨  b^{1, 904}_2
c    -b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_1
c    -b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨  b^{1, 904}_0
c  in DIMACS:
-3869 -3870  3871 -903  3872 0
-3869 -3870  3871 -903 -3873 0
-3869 -3870  3871 -903  3874 0

c  -1+1 --> 0
c    ( b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0 ∧  p_903) -> (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧ -b^{1, 904}_0)
c  in CNF:
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_2
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_1
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_0
c  in DIMACS:
-3869  3870 -3871 -903 -3872 0
-3869  3870 -3871 -903 -3873 0
-3869  3870 -3871 -903 -3874 0

c  0+1 --> 1
c    (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧  p_903) -> (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0)
c  in CNF:
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_2
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_1
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨  b^{1, 904}_0
c  in DIMACS:
 3869  3870  3871 -903 -3872 0
 3869  3870  3871 -903 -3873 0
 3869  3870  3871 -903  3874 0

c  1+1 --> 2
c    (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0 ∧  p_903) -> (-b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0)
c  in CNF:
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_2
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨  b^{1, 904}_1
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ -p_903 ∨ -b^{1, 904}_0
c  in DIMACS:
 3869  3870 -3871 -903 -3872 0
 3869  3870 -3871 -903  3873 0
 3869  3870 -3871 -903 -3874 0

c  2+1 --> break 
c    (-b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧  p_903) -> break
c  in CNF:
c     b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 3869 -3870  3871 -903 1162 0


c  2-1 --> 1
c    (-b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧ -p_903) -> (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0)
c  in CNF:
c     b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_2
c     b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_1
c     b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨  b^{1, 904}_0
c  in DIMACS:
 3869 -3870  3871  903 -3872 0
 3869 -3870  3871  903 -3873 0
 3869 -3870  3871  903  3874 0

c  1-1 --> 0
c    (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0 ∧ -p_903) -> (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧ -b^{1, 904}_0)
c  in CNF:
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_2
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_1
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_0
c  in DIMACS:
 3869  3870 -3871  903 -3872 0
 3869  3870 -3871  903 -3873 0
 3869  3870 -3871  903 -3874 0

c  0-1 --> -1
c    (-b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧ -p_903) -> ( b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0)
c  in CNF:
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨  b^{1, 904}_2
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_1
c     b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨  b^{1, 904}_0
c  in DIMACS:
 3869  3870  3871  903  3872 0
 3869  3870  3871  903 -3873 0
 3869  3870  3871  903  3874 0

c  -1-1 --> -2
c    ( b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧  b^{1, 903}_0 ∧ -p_903) -> ( b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0)
c  in CNF:
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨  b^{1, 904}_2
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨  b^{1, 904}_1
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨  p_903 ∨ -b^{1, 904}_0
c  in DIMACS:
-3869  3870 -3871  903  3872 0
-3869  3870 -3871  903  3873 0
-3869  3870 -3871  903 -3874 0

c  -2-1 --> break 
c    ( b^{1, 903}_2 ∧  b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨  b^{1, 903}_0 ∨  p_903 ∨ break
c  in DIMACS:
-3869 -3870  3871  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 903}_2 ∧ -b^{1, 903}_1 ∧ -b^{1, 903}_0 ∧ true) 
c  in CNF:
c    -b^{1, 903}_2 ∨  b^{1, 903}_1 ∨  b^{1, 903}_0 ∨ false 
c  in DIMACS:
-3869  3870  3871  0

c  3 does not represent an automaton state.
c    -(-b^{1, 903}_2 ∧  b^{1, 903}_1 ∧  b^{1, 903}_0 ∧ true) 
c  in CNF:
c     b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ false 
c  in DIMACS:
 3869 -3870 -3871  0
c  -3 does not represent an automaton state.
c    -( b^{1, 903}_2 ∧  b^{1, 903}_1 ∧  b^{1, 903}_0 ∧ true) 
c  in CNF:
c    -b^{1, 903}_2 ∨ -b^{1, 903}_1 ∨ -b^{1, 903}_0 ∨ false 
c  in DIMACS:
-3869 -3870 -3871  0

c i = 904
c  -2+1 --> -1
c    ( b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧  p_904) -> ( b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0)
c  in CNF:
c    -b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨  b^{1, 905}_2
c    -b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_1
c    -b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨  b^{1, 905}_0
c  in DIMACS:
-3872 -3873  3874 -904  3875 0
-3872 -3873  3874 -904 -3876 0
-3872 -3873  3874 -904  3877 0

c  -1+1 --> 0
c    ( b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0 ∧  p_904) -> (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧ -b^{1, 905}_0)
c  in CNF:
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_2
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_1
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_0
c  in DIMACS:
-3872  3873 -3874 -904 -3875 0
-3872  3873 -3874 -904 -3876 0
-3872  3873 -3874 -904 -3877 0

c  0+1 --> 1
c    (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧  p_904) -> (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0)
c  in CNF:
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_2
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_1
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨  b^{1, 905}_0
c  in DIMACS:
 3872  3873  3874 -904 -3875 0
 3872  3873  3874 -904 -3876 0
 3872  3873  3874 -904  3877 0

c  1+1 --> 2
c    (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0 ∧  p_904) -> (-b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0)
c  in CNF:
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_2
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨  b^{1, 905}_1
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ -p_904 ∨ -b^{1, 905}_0
c  in DIMACS:
 3872  3873 -3874 -904 -3875 0
 3872  3873 -3874 -904  3876 0
 3872  3873 -3874 -904 -3877 0

c  2+1 --> break 
c    (-b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧  p_904) -> break
c  in CNF:
c     b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 3872 -3873  3874 -904 1162 0


c  2-1 --> 1
c    (-b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧ -p_904) -> (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0)
c  in CNF:
c     b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_2
c     b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_1
c     b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨  b^{1, 905}_0
c  in DIMACS:
 3872 -3873  3874  904 -3875 0
 3872 -3873  3874  904 -3876 0
 3872 -3873  3874  904  3877 0

c  1-1 --> 0
c    (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0 ∧ -p_904) -> (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧ -b^{1, 905}_0)
c  in CNF:
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_2
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_1
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_0
c  in DIMACS:
 3872  3873 -3874  904 -3875 0
 3872  3873 -3874  904 -3876 0
 3872  3873 -3874  904 -3877 0

c  0-1 --> -1
c    (-b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧ -p_904) -> ( b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0)
c  in CNF:
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨  b^{1, 905}_2
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_1
c     b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨  b^{1, 905}_0
c  in DIMACS:
 3872  3873  3874  904  3875 0
 3872  3873  3874  904 -3876 0
 3872  3873  3874  904  3877 0

c  -1-1 --> -2
c    ( b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧  b^{1, 904}_0 ∧ -p_904) -> ( b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0)
c  in CNF:
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨  b^{1, 905}_2
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨  b^{1, 905}_1
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨  p_904 ∨ -b^{1, 905}_0
c  in DIMACS:
-3872  3873 -3874  904  3875 0
-3872  3873 -3874  904  3876 0
-3872  3873 -3874  904 -3877 0

c  -2-1 --> break 
c    ( b^{1, 904}_2 ∧  b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨  b^{1, 904}_0 ∨  p_904 ∨ break
c  in DIMACS:
-3872 -3873  3874  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 904}_2 ∧ -b^{1, 904}_1 ∧ -b^{1, 904}_0 ∧ true) 
c  in CNF:
c    -b^{1, 904}_2 ∨  b^{1, 904}_1 ∨  b^{1, 904}_0 ∨ false 
c  in DIMACS:
-3872  3873  3874  0

c  3 does not represent an automaton state.
c    -(-b^{1, 904}_2 ∧  b^{1, 904}_1 ∧  b^{1, 904}_0 ∧ true) 
c  in CNF:
c     b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ false 
c  in DIMACS:
 3872 -3873 -3874  0
c  -3 does not represent an automaton state.
c    -( b^{1, 904}_2 ∧  b^{1, 904}_1 ∧  b^{1, 904}_0 ∧ true) 
c  in CNF:
c    -b^{1, 904}_2 ∨ -b^{1, 904}_1 ∨ -b^{1, 904}_0 ∨ false 
c  in DIMACS:
-3872 -3873 -3874  0

c i = 905
c  -2+1 --> -1
c    ( b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧  p_905) -> ( b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0)
c  in CNF:
c    -b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨  b^{1, 906}_2
c    -b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_1
c    -b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨  b^{1, 906}_0
c  in DIMACS:
-3875 -3876  3877 -905  3878 0
-3875 -3876  3877 -905 -3879 0
-3875 -3876  3877 -905  3880 0

c  -1+1 --> 0
c    ( b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0 ∧  p_905) -> (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧ -b^{1, 906}_0)
c  in CNF:
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_2
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_1
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_0
c  in DIMACS:
-3875  3876 -3877 -905 -3878 0
-3875  3876 -3877 -905 -3879 0
-3875  3876 -3877 -905 -3880 0

c  0+1 --> 1
c    (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧  p_905) -> (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0)
c  in CNF:
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_2
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_1
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨  b^{1, 906}_0
c  in DIMACS:
 3875  3876  3877 -905 -3878 0
 3875  3876  3877 -905 -3879 0
 3875  3876  3877 -905  3880 0

c  1+1 --> 2
c    (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0 ∧  p_905) -> (-b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0)
c  in CNF:
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_2
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨  b^{1, 906}_1
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ -p_905 ∨ -b^{1, 906}_0
c  in DIMACS:
 3875  3876 -3877 -905 -3878 0
 3875  3876 -3877 -905  3879 0
 3875  3876 -3877 -905 -3880 0

c  2+1 --> break 
c    (-b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧  p_905) -> break
c  in CNF:
c     b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ -p_905 ∨ break
c  in DIMACS:
 3875 -3876  3877 -905 1162 0


c  2-1 --> 1
c    (-b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧ -p_905) -> (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0)
c  in CNF:
c     b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_2
c     b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_1
c     b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨  b^{1, 906}_0
c  in DIMACS:
 3875 -3876  3877  905 -3878 0
 3875 -3876  3877  905 -3879 0
 3875 -3876  3877  905  3880 0

c  1-1 --> 0
c    (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0 ∧ -p_905) -> (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧ -b^{1, 906}_0)
c  in CNF:
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_2
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_1
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_0
c  in DIMACS:
 3875  3876 -3877  905 -3878 0
 3875  3876 -3877  905 -3879 0
 3875  3876 -3877  905 -3880 0

c  0-1 --> -1
c    (-b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧ -p_905) -> ( b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0)
c  in CNF:
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨  b^{1, 906}_2
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_1
c     b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨  b^{1, 906}_0
c  in DIMACS:
 3875  3876  3877  905  3878 0
 3875  3876  3877  905 -3879 0
 3875  3876  3877  905  3880 0

c  -1-1 --> -2
c    ( b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧  b^{1, 905}_0 ∧ -p_905) -> ( b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0)
c  in CNF:
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨  b^{1, 906}_2
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨  b^{1, 906}_1
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨  p_905 ∨ -b^{1, 906}_0
c  in DIMACS:
-3875  3876 -3877  905  3878 0
-3875  3876 -3877  905  3879 0
-3875  3876 -3877  905 -3880 0

c  -2-1 --> break 
c    ( b^{1, 905}_2 ∧  b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧ -p_905) -> break
c  in CNF:
c    -b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨  b^{1, 905}_0 ∨  p_905 ∨ break
c  in DIMACS:
-3875 -3876  3877  905 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 905}_2 ∧ -b^{1, 905}_1 ∧ -b^{1, 905}_0 ∧ true) 
c  in CNF:
c    -b^{1, 905}_2 ∨  b^{1, 905}_1 ∨  b^{1, 905}_0 ∨ false 
c  in DIMACS:
-3875  3876  3877  0

c  3 does not represent an automaton state.
c    -(-b^{1, 905}_2 ∧  b^{1, 905}_1 ∧  b^{1, 905}_0 ∧ true) 
c  in CNF:
c     b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ false 
c  in DIMACS:
 3875 -3876 -3877  0
c  -3 does not represent an automaton state.
c    -( b^{1, 905}_2 ∧  b^{1, 905}_1 ∧  b^{1, 905}_0 ∧ true) 
c  in CNF:
c    -b^{1, 905}_2 ∨ -b^{1, 905}_1 ∨ -b^{1, 905}_0 ∨ false 
c  in DIMACS:
-3875 -3876 -3877  0

c i = 906
c  -2+1 --> -1
c    ( b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧  p_906) -> ( b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0)
c  in CNF:
c    -b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨  b^{1, 907}_2
c    -b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_1
c    -b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨  b^{1, 907}_0
c  in DIMACS:
-3878 -3879  3880 -906  3881 0
-3878 -3879  3880 -906 -3882 0
-3878 -3879  3880 -906  3883 0

c  -1+1 --> 0
c    ( b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0 ∧  p_906) -> (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧ -b^{1, 907}_0)
c  in CNF:
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_2
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_1
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_0
c  in DIMACS:
-3878  3879 -3880 -906 -3881 0
-3878  3879 -3880 -906 -3882 0
-3878  3879 -3880 -906 -3883 0

c  0+1 --> 1
c    (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧  p_906) -> (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0)
c  in CNF:
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_2
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_1
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨  b^{1, 907}_0
c  in DIMACS:
 3878  3879  3880 -906 -3881 0
 3878  3879  3880 -906 -3882 0
 3878  3879  3880 -906  3883 0

c  1+1 --> 2
c    (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0 ∧  p_906) -> (-b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0)
c  in CNF:
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_2
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨  b^{1, 907}_1
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ -p_906 ∨ -b^{1, 907}_0
c  in DIMACS:
 3878  3879 -3880 -906 -3881 0
 3878  3879 -3880 -906  3882 0
 3878  3879 -3880 -906 -3883 0

c  2+1 --> break 
c    (-b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧  p_906) -> break
c  in CNF:
c     b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 3878 -3879  3880 -906 1162 0


c  2-1 --> 1
c    (-b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧ -p_906) -> (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0)
c  in CNF:
c     b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_2
c     b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_1
c     b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨  b^{1, 907}_0
c  in DIMACS:
 3878 -3879  3880  906 -3881 0
 3878 -3879  3880  906 -3882 0
 3878 -3879  3880  906  3883 0

c  1-1 --> 0
c    (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0 ∧ -p_906) -> (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧ -b^{1, 907}_0)
c  in CNF:
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_2
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_1
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_0
c  in DIMACS:
 3878  3879 -3880  906 -3881 0
 3878  3879 -3880  906 -3882 0
 3878  3879 -3880  906 -3883 0

c  0-1 --> -1
c    (-b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧ -p_906) -> ( b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0)
c  in CNF:
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨  b^{1, 907}_2
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_1
c     b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨  b^{1, 907}_0
c  in DIMACS:
 3878  3879  3880  906  3881 0
 3878  3879  3880  906 -3882 0
 3878  3879  3880  906  3883 0

c  -1-1 --> -2
c    ( b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧  b^{1, 906}_0 ∧ -p_906) -> ( b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0)
c  in CNF:
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨  b^{1, 907}_2
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨  b^{1, 907}_1
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨  p_906 ∨ -b^{1, 907}_0
c  in DIMACS:
-3878  3879 -3880  906  3881 0
-3878  3879 -3880  906  3882 0
-3878  3879 -3880  906 -3883 0

c  -2-1 --> break 
c    ( b^{1, 906}_2 ∧  b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨  b^{1, 906}_0 ∨  p_906 ∨ break
c  in DIMACS:
-3878 -3879  3880  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 906}_2 ∧ -b^{1, 906}_1 ∧ -b^{1, 906}_0 ∧ true) 
c  in CNF:
c    -b^{1, 906}_2 ∨  b^{1, 906}_1 ∨  b^{1, 906}_0 ∨ false 
c  in DIMACS:
-3878  3879  3880  0

c  3 does not represent an automaton state.
c    -(-b^{1, 906}_2 ∧  b^{1, 906}_1 ∧  b^{1, 906}_0 ∧ true) 
c  in CNF:
c     b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ false 
c  in DIMACS:
 3878 -3879 -3880  0
c  -3 does not represent an automaton state.
c    -( b^{1, 906}_2 ∧  b^{1, 906}_1 ∧  b^{1, 906}_0 ∧ true) 
c  in CNF:
c    -b^{1, 906}_2 ∨ -b^{1, 906}_1 ∨ -b^{1, 906}_0 ∨ false 
c  in DIMACS:
-3878 -3879 -3880  0

c i = 907
c  -2+1 --> -1
c    ( b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧  p_907) -> ( b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0)
c  in CNF:
c    -b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨  b^{1, 908}_2
c    -b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_1
c    -b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨  b^{1, 908}_0
c  in DIMACS:
-3881 -3882  3883 -907  3884 0
-3881 -3882  3883 -907 -3885 0
-3881 -3882  3883 -907  3886 0

c  -1+1 --> 0
c    ( b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0 ∧  p_907) -> (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧ -b^{1, 908}_0)
c  in CNF:
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_2
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_1
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_0
c  in DIMACS:
-3881  3882 -3883 -907 -3884 0
-3881  3882 -3883 -907 -3885 0
-3881  3882 -3883 -907 -3886 0

c  0+1 --> 1
c    (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧  p_907) -> (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0)
c  in CNF:
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_2
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_1
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨  b^{1, 908}_0
c  in DIMACS:
 3881  3882  3883 -907 -3884 0
 3881  3882  3883 -907 -3885 0
 3881  3882  3883 -907  3886 0

c  1+1 --> 2
c    (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0 ∧  p_907) -> (-b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0)
c  in CNF:
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_2
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨  b^{1, 908}_1
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ -p_907 ∨ -b^{1, 908}_0
c  in DIMACS:
 3881  3882 -3883 -907 -3884 0
 3881  3882 -3883 -907  3885 0
 3881  3882 -3883 -907 -3886 0

c  2+1 --> break 
c    (-b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧  p_907) -> break
c  in CNF:
c     b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ -p_907 ∨ break
c  in DIMACS:
 3881 -3882  3883 -907 1162 0


c  2-1 --> 1
c    (-b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧ -p_907) -> (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0)
c  in CNF:
c     b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_2
c     b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_1
c     b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨  b^{1, 908}_0
c  in DIMACS:
 3881 -3882  3883  907 -3884 0
 3881 -3882  3883  907 -3885 0
 3881 -3882  3883  907  3886 0

c  1-1 --> 0
c    (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0 ∧ -p_907) -> (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧ -b^{1, 908}_0)
c  in CNF:
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_2
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_1
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_0
c  in DIMACS:
 3881  3882 -3883  907 -3884 0
 3881  3882 -3883  907 -3885 0
 3881  3882 -3883  907 -3886 0

c  0-1 --> -1
c    (-b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧ -p_907) -> ( b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0)
c  in CNF:
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨  b^{1, 908}_2
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_1
c     b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨  b^{1, 908}_0
c  in DIMACS:
 3881  3882  3883  907  3884 0
 3881  3882  3883  907 -3885 0
 3881  3882  3883  907  3886 0

c  -1-1 --> -2
c    ( b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧  b^{1, 907}_0 ∧ -p_907) -> ( b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0)
c  in CNF:
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨  b^{1, 908}_2
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨  b^{1, 908}_1
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨  p_907 ∨ -b^{1, 908}_0
c  in DIMACS:
-3881  3882 -3883  907  3884 0
-3881  3882 -3883  907  3885 0
-3881  3882 -3883  907 -3886 0

c  -2-1 --> break 
c    ( b^{1, 907}_2 ∧  b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧ -p_907) -> break
c  in CNF:
c    -b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨  b^{1, 907}_0 ∨  p_907 ∨ break
c  in DIMACS:
-3881 -3882  3883  907 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 907}_2 ∧ -b^{1, 907}_1 ∧ -b^{1, 907}_0 ∧ true) 
c  in CNF:
c    -b^{1, 907}_2 ∨  b^{1, 907}_1 ∨  b^{1, 907}_0 ∨ false 
c  in DIMACS:
-3881  3882  3883  0

c  3 does not represent an automaton state.
c    -(-b^{1, 907}_2 ∧  b^{1, 907}_1 ∧  b^{1, 907}_0 ∧ true) 
c  in CNF:
c     b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ false 
c  in DIMACS:
 3881 -3882 -3883  0
c  -3 does not represent an automaton state.
c    -( b^{1, 907}_2 ∧  b^{1, 907}_1 ∧  b^{1, 907}_0 ∧ true) 
c  in CNF:
c    -b^{1, 907}_2 ∨ -b^{1, 907}_1 ∨ -b^{1, 907}_0 ∨ false 
c  in DIMACS:
-3881 -3882 -3883  0

c i = 908
c  -2+1 --> -1
c    ( b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧  p_908) -> ( b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0)
c  in CNF:
c    -b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨  b^{1, 909}_2
c    -b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_1
c    -b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨  b^{1, 909}_0
c  in DIMACS:
-3884 -3885  3886 -908  3887 0
-3884 -3885  3886 -908 -3888 0
-3884 -3885  3886 -908  3889 0

c  -1+1 --> 0
c    ( b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0 ∧  p_908) -> (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧ -b^{1, 909}_0)
c  in CNF:
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_2
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_1
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_0
c  in DIMACS:
-3884  3885 -3886 -908 -3887 0
-3884  3885 -3886 -908 -3888 0
-3884  3885 -3886 -908 -3889 0

c  0+1 --> 1
c    (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧  p_908) -> (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0)
c  in CNF:
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_2
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_1
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨  b^{1, 909}_0
c  in DIMACS:
 3884  3885  3886 -908 -3887 0
 3884  3885  3886 -908 -3888 0
 3884  3885  3886 -908  3889 0

c  1+1 --> 2
c    (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0 ∧  p_908) -> (-b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0)
c  in CNF:
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_2
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨  b^{1, 909}_1
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ -p_908 ∨ -b^{1, 909}_0
c  in DIMACS:
 3884  3885 -3886 -908 -3887 0
 3884  3885 -3886 -908  3888 0
 3884  3885 -3886 -908 -3889 0

c  2+1 --> break 
c    (-b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧  p_908) -> break
c  in CNF:
c     b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ -p_908 ∨ break
c  in DIMACS:
 3884 -3885  3886 -908 1162 0


c  2-1 --> 1
c    (-b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧ -p_908) -> (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0)
c  in CNF:
c     b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_2
c     b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_1
c     b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨  b^{1, 909}_0
c  in DIMACS:
 3884 -3885  3886  908 -3887 0
 3884 -3885  3886  908 -3888 0
 3884 -3885  3886  908  3889 0

c  1-1 --> 0
c    (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0 ∧ -p_908) -> (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧ -b^{1, 909}_0)
c  in CNF:
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_2
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_1
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_0
c  in DIMACS:
 3884  3885 -3886  908 -3887 0
 3884  3885 -3886  908 -3888 0
 3884  3885 -3886  908 -3889 0

c  0-1 --> -1
c    (-b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧ -p_908) -> ( b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0)
c  in CNF:
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨  b^{1, 909}_2
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_1
c     b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨  b^{1, 909}_0
c  in DIMACS:
 3884  3885  3886  908  3887 0
 3884  3885  3886  908 -3888 0
 3884  3885  3886  908  3889 0

c  -1-1 --> -2
c    ( b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧  b^{1, 908}_0 ∧ -p_908) -> ( b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0)
c  in CNF:
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨  b^{1, 909}_2
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨  b^{1, 909}_1
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨  p_908 ∨ -b^{1, 909}_0
c  in DIMACS:
-3884  3885 -3886  908  3887 0
-3884  3885 -3886  908  3888 0
-3884  3885 -3886  908 -3889 0

c  -2-1 --> break 
c    ( b^{1, 908}_2 ∧  b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧ -p_908) -> break
c  in CNF:
c    -b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨  b^{1, 908}_0 ∨  p_908 ∨ break
c  in DIMACS:
-3884 -3885  3886  908 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 908}_2 ∧ -b^{1, 908}_1 ∧ -b^{1, 908}_0 ∧ true) 
c  in CNF:
c    -b^{1, 908}_2 ∨  b^{1, 908}_1 ∨  b^{1, 908}_0 ∨ false 
c  in DIMACS:
-3884  3885  3886  0

c  3 does not represent an automaton state.
c    -(-b^{1, 908}_2 ∧  b^{1, 908}_1 ∧  b^{1, 908}_0 ∧ true) 
c  in CNF:
c     b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ false 
c  in DIMACS:
 3884 -3885 -3886  0
c  -3 does not represent an automaton state.
c    -( b^{1, 908}_2 ∧  b^{1, 908}_1 ∧  b^{1, 908}_0 ∧ true) 
c  in CNF:
c    -b^{1, 908}_2 ∨ -b^{1, 908}_1 ∨ -b^{1, 908}_0 ∨ false 
c  in DIMACS:
-3884 -3885 -3886  0

c i = 909
c  -2+1 --> -1
c    ( b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧  p_909) -> ( b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0)
c  in CNF:
c    -b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨  b^{1, 910}_2
c    -b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_1
c    -b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨  b^{1, 910}_0
c  in DIMACS:
-3887 -3888  3889 -909  3890 0
-3887 -3888  3889 -909 -3891 0
-3887 -3888  3889 -909  3892 0

c  -1+1 --> 0
c    ( b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0 ∧  p_909) -> (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧ -b^{1, 910}_0)
c  in CNF:
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_2
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_1
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_0
c  in DIMACS:
-3887  3888 -3889 -909 -3890 0
-3887  3888 -3889 -909 -3891 0
-3887  3888 -3889 -909 -3892 0

c  0+1 --> 1
c    (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧  p_909) -> (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0)
c  in CNF:
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_2
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_1
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨  b^{1, 910}_0
c  in DIMACS:
 3887  3888  3889 -909 -3890 0
 3887  3888  3889 -909 -3891 0
 3887  3888  3889 -909  3892 0

c  1+1 --> 2
c    (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0 ∧  p_909) -> (-b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0)
c  in CNF:
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_2
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨  b^{1, 910}_1
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ -p_909 ∨ -b^{1, 910}_0
c  in DIMACS:
 3887  3888 -3889 -909 -3890 0
 3887  3888 -3889 -909  3891 0
 3887  3888 -3889 -909 -3892 0

c  2+1 --> break 
c    (-b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧  p_909) -> break
c  in CNF:
c     b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ -p_909 ∨ break
c  in DIMACS:
 3887 -3888  3889 -909 1162 0


c  2-1 --> 1
c    (-b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧ -p_909) -> (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0)
c  in CNF:
c     b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_2
c     b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_1
c     b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨  b^{1, 910}_0
c  in DIMACS:
 3887 -3888  3889  909 -3890 0
 3887 -3888  3889  909 -3891 0
 3887 -3888  3889  909  3892 0

c  1-1 --> 0
c    (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0 ∧ -p_909) -> (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧ -b^{1, 910}_0)
c  in CNF:
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_2
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_1
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_0
c  in DIMACS:
 3887  3888 -3889  909 -3890 0
 3887  3888 -3889  909 -3891 0
 3887  3888 -3889  909 -3892 0

c  0-1 --> -1
c    (-b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧ -p_909) -> ( b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0)
c  in CNF:
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨  b^{1, 910}_2
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_1
c     b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨  b^{1, 910}_0
c  in DIMACS:
 3887  3888  3889  909  3890 0
 3887  3888  3889  909 -3891 0
 3887  3888  3889  909  3892 0

c  -1-1 --> -2
c    ( b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧  b^{1, 909}_0 ∧ -p_909) -> ( b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0)
c  in CNF:
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨  b^{1, 910}_2
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨  b^{1, 910}_1
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨  p_909 ∨ -b^{1, 910}_0
c  in DIMACS:
-3887  3888 -3889  909  3890 0
-3887  3888 -3889  909  3891 0
-3887  3888 -3889  909 -3892 0

c  -2-1 --> break 
c    ( b^{1, 909}_2 ∧  b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧ -p_909) -> break
c  in CNF:
c    -b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨  b^{1, 909}_0 ∨  p_909 ∨ break
c  in DIMACS:
-3887 -3888  3889  909 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 909}_2 ∧ -b^{1, 909}_1 ∧ -b^{1, 909}_0 ∧ true) 
c  in CNF:
c    -b^{1, 909}_2 ∨  b^{1, 909}_1 ∨  b^{1, 909}_0 ∨ false 
c  in DIMACS:
-3887  3888  3889  0

c  3 does not represent an automaton state.
c    -(-b^{1, 909}_2 ∧  b^{1, 909}_1 ∧  b^{1, 909}_0 ∧ true) 
c  in CNF:
c     b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ false 
c  in DIMACS:
 3887 -3888 -3889  0
c  -3 does not represent an automaton state.
c    -( b^{1, 909}_2 ∧  b^{1, 909}_1 ∧  b^{1, 909}_0 ∧ true) 
c  in CNF:
c    -b^{1, 909}_2 ∨ -b^{1, 909}_1 ∨ -b^{1, 909}_0 ∨ false 
c  in DIMACS:
-3887 -3888 -3889  0

c i = 910
c  -2+1 --> -1
c    ( b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧  p_910) -> ( b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0)
c  in CNF:
c    -b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨  b^{1, 911}_2
c    -b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_1
c    -b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨  b^{1, 911}_0
c  in DIMACS:
-3890 -3891  3892 -910  3893 0
-3890 -3891  3892 -910 -3894 0
-3890 -3891  3892 -910  3895 0

c  -1+1 --> 0
c    ( b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0 ∧  p_910) -> (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧ -b^{1, 911}_0)
c  in CNF:
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_2
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_1
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_0
c  in DIMACS:
-3890  3891 -3892 -910 -3893 0
-3890  3891 -3892 -910 -3894 0
-3890  3891 -3892 -910 -3895 0

c  0+1 --> 1
c    (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧  p_910) -> (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0)
c  in CNF:
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_2
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_1
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨  b^{1, 911}_0
c  in DIMACS:
 3890  3891  3892 -910 -3893 0
 3890  3891  3892 -910 -3894 0
 3890  3891  3892 -910  3895 0

c  1+1 --> 2
c    (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0 ∧  p_910) -> (-b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0)
c  in CNF:
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_2
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨  b^{1, 911}_1
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ -p_910 ∨ -b^{1, 911}_0
c  in DIMACS:
 3890  3891 -3892 -910 -3893 0
 3890  3891 -3892 -910  3894 0
 3890  3891 -3892 -910 -3895 0

c  2+1 --> break 
c    (-b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧  p_910) -> break
c  in CNF:
c     b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 3890 -3891  3892 -910 1162 0


c  2-1 --> 1
c    (-b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧ -p_910) -> (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0)
c  in CNF:
c     b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_2
c     b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_1
c     b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨  b^{1, 911}_0
c  in DIMACS:
 3890 -3891  3892  910 -3893 0
 3890 -3891  3892  910 -3894 0
 3890 -3891  3892  910  3895 0

c  1-1 --> 0
c    (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0 ∧ -p_910) -> (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧ -b^{1, 911}_0)
c  in CNF:
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_2
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_1
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_0
c  in DIMACS:
 3890  3891 -3892  910 -3893 0
 3890  3891 -3892  910 -3894 0
 3890  3891 -3892  910 -3895 0

c  0-1 --> -1
c    (-b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧ -p_910) -> ( b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0)
c  in CNF:
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨  b^{1, 911}_2
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_1
c     b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨  b^{1, 911}_0
c  in DIMACS:
 3890  3891  3892  910  3893 0
 3890  3891  3892  910 -3894 0
 3890  3891  3892  910  3895 0

c  -1-1 --> -2
c    ( b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧  b^{1, 910}_0 ∧ -p_910) -> ( b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0)
c  in CNF:
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨  b^{1, 911}_2
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨  b^{1, 911}_1
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨  p_910 ∨ -b^{1, 911}_0
c  in DIMACS:
-3890  3891 -3892  910  3893 0
-3890  3891 -3892  910  3894 0
-3890  3891 -3892  910 -3895 0

c  -2-1 --> break 
c    ( b^{1, 910}_2 ∧  b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨  b^{1, 910}_0 ∨  p_910 ∨ break
c  in DIMACS:
-3890 -3891  3892  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 910}_2 ∧ -b^{1, 910}_1 ∧ -b^{1, 910}_0 ∧ true) 
c  in CNF:
c    -b^{1, 910}_2 ∨  b^{1, 910}_1 ∨  b^{1, 910}_0 ∨ false 
c  in DIMACS:
-3890  3891  3892  0

c  3 does not represent an automaton state.
c    -(-b^{1, 910}_2 ∧  b^{1, 910}_1 ∧  b^{1, 910}_0 ∧ true) 
c  in CNF:
c     b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ false 
c  in DIMACS:
 3890 -3891 -3892  0
c  -3 does not represent an automaton state.
c    -( b^{1, 910}_2 ∧  b^{1, 910}_1 ∧  b^{1, 910}_0 ∧ true) 
c  in CNF:
c    -b^{1, 910}_2 ∨ -b^{1, 910}_1 ∨ -b^{1, 910}_0 ∨ false 
c  in DIMACS:
-3890 -3891 -3892  0

c i = 911
c  -2+1 --> -1
c    ( b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧  p_911) -> ( b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0)
c  in CNF:
c    -b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨  b^{1, 912}_2
c    -b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_1
c    -b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨  b^{1, 912}_0
c  in DIMACS:
-3893 -3894  3895 -911  3896 0
-3893 -3894  3895 -911 -3897 0
-3893 -3894  3895 -911  3898 0

c  -1+1 --> 0
c    ( b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0 ∧  p_911) -> (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧ -b^{1, 912}_0)
c  in CNF:
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_2
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_1
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_0
c  in DIMACS:
-3893  3894 -3895 -911 -3896 0
-3893  3894 -3895 -911 -3897 0
-3893  3894 -3895 -911 -3898 0

c  0+1 --> 1
c    (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧  p_911) -> (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0)
c  in CNF:
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_2
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_1
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨  b^{1, 912}_0
c  in DIMACS:
 3893  3894  3895 -911 -3896 0
 3893  3894  3895 -911 -3897 0
 3893  3894  3895 -911  3898 0

c  1+1 --> 2
c    (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0 ∧  p_911) -> (-b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0)
c  in CNF:
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_2
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨  b^{1, 912}_1
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ -p_911 ∨ -b^{1, 912}_0
c  in DIMACS:
 3893  3894 -3895 -911 -3896 0
 3893  3894 -3895 -911  3897 0
 3893  3894 -3895 -911 -3898 0

c  2+1 --> break 
c    (-b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧  p_911) -> break
c  in CNF:
c     b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ -p_911 ∨ break
c  in DIMACS:
 3893 -3894  3895 -911 1162 0


c  2-1 --> 1
c    (-b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧ -p_911) -> (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0)
c  in CNF:
c     b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_2
c     b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_1
c     b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨  b^{1, 912}_0
c  in DIMACS:
 3893 -3894  3895  911 -3896 0
 3893 -3894  3895  911 -3897 0
 3893 -3894  3895  911  3898 0

c  1-1 --> 0
c    (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0 ∧ -p_911) -> (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧ -b^{1, 912}_0)
c  in CNF:
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_2
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_1
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_0
c  in DIMACS:
 3893  3894 -3895  911 -3896 0
 3893  3894 -3895  911 -3897 0
 3893  3894 -3895  911 -3898 0

c  0-1 --> -1
c    (-b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧ -p_911) -> ( b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0)
c  in CNF:
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨  b^{1, 912}_2
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_1
c     b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨  b^{1, 912}_0
c  in DIMACS:
 3893  3894  3895  911  3896 0
 3893  3894  3895  911 -3897 0
 3893  3894  3895  911  3898 0

c  -1-1 --> -2
c    ( b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧  b^{1, 911}_0 ∧ -p_911) -> ( b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0)
c  in CNF:
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨  b^{1, 912}_2
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨  b^{1, 912}_1
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨  p_911 ∨ -b^{1, 912}_0
c  in DIMACS:
-3893  3894 -3895  911  3896 0
-3893  3894 -3895  911  3897 0
-3893  3894 -3895  911 -3898 0

c  -2-1 --> break 
c    ( b^{1, 911}_2 ∧  b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧ -p_911) -> break
c  in CNF:
c    -b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨  b^{1, 911}_0 ∨  p_911 ∨ break
c  in DIMACS:
-3893 -3894  3895  911 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 911}_2 ∧ -b^{1, 911}_1 ∧ -b^{1, 911}_0 ∧ true) 
c  in CNF:
c    -b^{1, 911}_2 ∨  b^{1, 911}_1 ∨  b^{1, 911}_0 ∨ false 
c  in DIMACS:
-3893  3894  3895  0

c  3 does not represent an automaton state.
c    -(-b^{1, 911}_2 ∧  b^{1, 911}_1 ∧  b^{1, 911}_0 ∧ true) 
c  in CNF:
c     b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ false 
c  in DIMACS:
 3893 -3894 -3895  0
c  -3 does not represent an automaton state.
c    -( b^{1, 911}_2 ∧  b^{1, 911}_1 ∧  b^{1, 911}_0 ∧ true) 
c  in CNF:
c    -b^{1, 911}_2 ∨ -b^{1, 911}_1 ∨ -b^{1, 911}_0 ∨ false 
c  in DIMACS:
-3893 -3894 -3895  0

c i = 912
c  -2+1 --> -1
c    ( b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧  p_912) -> ( b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0)
c  in CNF:
c    -b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨  b^{1, 913}_2
c    -b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_1
c    -b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨  b^{1, 913}_0
c  in DIMACS:
-3896 -3897  3898 -912  3899 0
-3896 -3897  3898 -912 -3900 0
-3896 -3897  3898 -912  3901 0

c  -1+1 --> 0
c    ( b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0 ∧  p_912) -> (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧ -b^{1, 913}_0)
c  in CNF:
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_2
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_1
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_0
c  in DIMACS:
-3896  3897 -3898 -912 -3899 0
-3896  3897 -3898 -912 -3900 0
-3896  3897 -3898 -912 -3901 0

c  0+1 --> 1
c    (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧  p_912) -> (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0)
c  in CNF:
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_2
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_1
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨  b^{1, 913}_0
c  in DIMACS:
 3896  3897  3898 -912 -3899 0
 3896  3897  3898 -912 -3900 0
 3896  3897  3898 -912  3901 0

c  1+1 --> 2
c    (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0 ∧  p_912) -> (-b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0)
c  in CNF:
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_2
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨  b^{1, 913}_1
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ -p_912 ∨ -b^{1, 913}_0
c  in DIMACS:
 3896  3897 -3898 -912 -3899 0
 3896  3897 -3898 -912  3900 0
 3896  3897 -3898 -912 -3901 0

c  2+1 --> break 
c    (-b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧  p_912) -> break
c  in CNF:
c     b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 3896 -3897  3898 -912 1162 0


c  2-1 --> 1
c    (-b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧ -p_912) -> (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0)
c  in CNF:
c     b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_2
c     b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_1
c     b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨  b^{1, 913}_0
c  in DIMACS:
 3896 -3897  3898  912 -3899 0
 3896 -3897  3898  912 -3900 0
 3896 -3897  3898  912  3901 0

c  1-1 --> 0
c    (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0 ∧ -p_912) -> (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧ -b^{1, 913}_0)
c  in CNF:
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_2
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_1
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_0
c  in DIMACS:
 3896  3897 -3898  912 -3899 0
 3896  3897 -3898  912 -3900 0
 3896  3897 -3898  912 -3901 0

c  0-1 --> -1
c    (-b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧ -p_912) -> ( b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0)
c  in CNF:
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨  b^{1, 913}_2
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_1
c     b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨  b^{1, 913}_0
c  in DIMACS:
 3896  3897  3898  912  3899 0
 3896  3897  3898  912 -3900 0
 3896  3897  3898  912  3901 0

c  -1-1 --> -2
c    ( b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧  b^{1, 912}_0 ∧ -p_912) -> ( b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0)
c  in CNF:
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨  b^{1, 913}_2
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨  b^{1, 913}_1
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨  p_912 ∨ -b^{1, 913}_0
c  in DIMACS:
-3896  3897 -3898  912  3899 0
-3896  3897 -3898  912  3900 0
-3896  3897 -3898  912 -3901 0

c  -2-1 --> break 
c    ( b^{1, 912}_2 ∧  b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨  b^{1, 912}_0 ∨  p_912 ∨ break
c  in DIMACS:
-3896 -3897  3898  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 912}_2 ∧ -b^{1, 912}_1 ∧ -b^{1, 912}_0 ∧ true) 
c  in CNF:
c    -b^{1, 912}_2 ∨  b^{1, 912}_1 ∨  b^{1, 912}_0 ∨ false 
c  in DIMACS:
-3896  3897  3898  0

c  3 does not represent an automaton state.
c    -(-b^{1, 912}_2 ∧  b^{1, 912}_1 ∧  b^{1, 912}_0 ∧ true) 
c  in CNF:
c     b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ false 
c  in DIMACS:
 3896 -3897 -3898  0
c  -3 does not represent an automaton state.
c    -( b^{1, 912}_2 ∧  b^{1, 912}_1 ∧  b^{1, 912}_0 ∧ true) 
c  in CNF:
c    -b^{1, 912}_2 ∨ -b^{1, 912}_1 ∨ -b^{1, 912}_0 ∨ false 
c  in DIMACS:
-3896 -3897 -3898  0

c i = 913
c  -2+1 --> -1
c    ( b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧  p_913) -> ( b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0)
c  in CNF:
c    -b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨  b^{1, 914}_2
c    -b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_1
c    -b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨  b^{1, 914}_0
c  in DIMACS:
-3899 -3900  3901 -913  3902 0
-3899 -3900  3901 -913 -3903 0
-3899 -3900  3901 -913  3904 0

c  -1+1 --> 0
c    ( b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0 ∧  p_913) -> (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧ -b^{1, 914}_0)
c  in CNF:
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_2
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_1
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_0
c  in DIMACS:
-3899  3900 -3901 -913 -3902 0
-3899  3900 -3901 -913 -3903 0
-3899  3900 -3901 -913 -3904 0

c  0+1 --> 1
c    (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧  p_913) -> (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0)
c  in CNF:
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_2
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_1
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨  b^{1, 914}_0
c  in DIMACS:
 3899  3900  3901 -913 -3902 0
 3899  3900  3901 -913 -3903 0
 3899  3900  3901 -913  3904 0

c  1+1 --> 2
c    (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0 ∧  p_913) -> (-b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0)
c  in CNF:
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_2
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨  b^{1, 914}_1
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ -p_913 ∨ -b^{1, 914}_0
c  in DIMACS:
 3899  3900 -3901 -913 -3902 0
 3899  3900 -3901 -913  3903 0
 3899  3900 -3901 -913 -3904 0

c  2+1 --> break 
c    (-b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧  p_913) -> break
c  in CNF:
c     b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ -p_913 ∨ break
c  in DIMACS:
 3899 -3900  3901 -913 1162 0


c  2-1 --> 1
c    (-b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧ -p_913) -> (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0)
c  in CNF:
c     b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_2
c     b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_1
c     b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨  b^{1, 914}_0
c  in DIMACS:
 3899 -3900  3901  913 -3902 0
 3899 -3900  3901  913 -3903 0
 3899 -3900  3901  913  3904 0

c  1-1 --> 0
c    (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0 ∧ -p_913) -> (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧ -b^{1, 914}_0)
c  in CNF:
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_2
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_1
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_0
c  in DIMACS:
 3899  3900 -3901  913 -3902 0
 3899  3900 -3901  913 -3903 0
 3899  3900 -3901  913 -3904 0

c  0-1 --> -1
c    (-b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧ -p_913) -> ( b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0)
c  in CNF:
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨  b^{1, 914}_2
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_1
c     b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨  b^{1, 914}_0
c  in DIMACS:
 3899  3900  3901  913  3902 0
 3899  3900  3901  913 -3903 0
 3899  3900  3901  913  3904 0

c  -1-1 --> -2
c    ( b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧  b^{1, 913}_0 ∧ -p_913) -> ( b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0)
c  in CNF:
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨  b^{1, 914}_2
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨  b^{1, 914}_1
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨  p_913 ∨ -b^{1, 914}_0
c  in DIMACS:
-3899  3900 -3901  913  3902 0
-3899  3900 -3901  913  3903 0
-3899  3900 -3901  913 -3904 0

c  -2-1 --> break 
c    ( b^{1, 913}_2 ∧  b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧ -p_913) -> break
c  in CNF:
c    -b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨  b^{1, 913}_0 ∨  p_913 ∨ break
c  in DIMACS:
-3899 -3900  3901  913 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 913}_2 ∧ -b^{1, 913}_1 ∧ -b^{1, 913}_0 ∧ true) 
c  in CNF:
c    -b^{1, 913}_2 ∨  b^{1, 913}_1 ∨  b^{1, 913}_0 ∨ false 
c  in DIMACS:
-3899  3900  3901  0

c  3 does not represent an automaton state.
c    -(-b^{1, 913}_2 ∧  b^{1, 913}_1 ∧  b^{1, 913}_0 ∧ true) 
c  in CNF:
c     b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ false 
c  in DIMACS:
 3899 -3900 -3901  0
c  -3 does not represent an automaton state.
c    -( b^{1, 913}_2 ∧  b^{1, 913}_1 ∧  b^{1, 913}_0 ∧ true) 
c  in CNF:
c    -b^{1, 913}_2 ∨ -b^{1, 913}_1 ∨ -b^{1, 913}_0 ∨ false 
c  in DIMACS:
-3899 -3900 -3901  0

c i = 914
c  -2+1 --> -1
c    ( b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧  p_914) -> ( b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0)
c  in CNF:
c    -b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨  b^{1, 915}_2
c    -b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_1
c    -b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨  b^{1, 915}_0
c  in DIMACS:
-3902 -3903  3904 -914  3905 0
-3902 -3903  3904 -914 -3906 0
-3902 -3903  3904 -914  3907 0

c  -1+1 --> 0
c    ( b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0 ∧  p_914) -> (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧ -b^{1, 915}_0)
c  in CNF:
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_2
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_1
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_0
c  in DIMACS:
-3902  3903 -3904 -914 -3905 0
-3902  3903 -3904 -914 -3906 0
-3902  3903 -3904 -914 -3907 0

c  0+1 --> 1
c    (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧  p_914) -> (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0)
c  in CNF:
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_2
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_1
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨  b^{1, 915}_0
c  in DIMACS:
 3902  3903  3904 -914 -3905 0
 3902  3903  3904 -914 -3906 0
 3902  3903  3904 -914  3907 0

c  1+1 --> 2
c    (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0 ∧  p_914) -> (-b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0)
c  in CNF:
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_2
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨  b^{1, 915}_1
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ -p_914 ∨ -b^{1, 915}_0
c  in DIMACS:
 3902  3903 -3904 -914 -3905 0
 3902  3903 -3904 -914  3906 0
 3902  3903 -3904 -914 -3907 0

c  2+1 --> break 
c    (-b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧  p_914) -> break
c  in CNF:
c     b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ -p_914 ∨ break
c  in DIMACS:
 3902 -3903  3904 -914 1162 0


c  2-1 --> 1
c    (-b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧ -p_914) -> (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0)
c  in CNF:
c     b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_2
c     b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_1
c     b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨  b^{1, 915}_0
c  in DIMACS:
 3902 -3903  3904  914 -3905 0
 3902 -3903  3904  914 -3906 0
 3902 -3903  3904  914  3907 0

c  1-1 --> 0
c    (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0 ∧ -p_914) -> (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧ -b^{1, 915}_0)
c  in CNF:
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_2
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_1
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_0
c  in DIMACS:
 3902  3903 -3904  914 -3905 0
 3902  3903 -3904  914 -3906 0
 3902  3903 -3904  914 -3907 0

c  0-1 --> -1
c    (-b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧ -p_914) -> ( b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0)
c  in CNF:
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨  b^{1, 915}_2
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_1
c     b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨  b^{1, 915}_0
c  in DIMACS:
 3902  3903  3904  914  3905 0
 3902  3903  3904  914 -3906 0
 3902  3903  3904  914  3907 0

c  -1-1 --> -2
c    ( b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧  b^{1, 914}_0 ∧ -p_914) -> ( b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0)
c  in CNF:
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨  b^{1, 915}_2
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨  b^{1, 915}_1
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨  p_914 ∨ -b^{1, 915}_0
c  in DIMACS:
-3902  3903 -3904  914  3905 0
-3902  3903 -3904  914  3906 0
-3902  3903 -3904  914 -3907 0

c  -2-1 --> break 
c    ( b^{1, 914}_2 ∧  b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧ -p_914) -> break
c  in CNF:
c    -b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨  b^{1, 914}_0 ∨  p_914 ∨ break
c  in DIMACS:
-3902 -3903  3904  914 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 914}_2 ∧ -b^{1, 914}_1 ∧ -b^{1, 914}_0 ∧ true) 
c  in CNF:
c    -b^{1, 914}_2 ∨  b^{1, 914}_1 ∨  b^{1, 914}_0 ∨ false 
c  in DIMACS:
-3902  3903  3904  0

c  3 does not represent an automaton state.
c    -(-b^{1, 914}_2 ∧  b^{1, 914}_1 ∧  b^{1, 914}_0 ∧ true) 
c  in CNF:
c     b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ false 
c  in DIMACS:
 3902 -3903 -3904  0
c  -3 does not represent an automaton state.
c    -( b^{1, 914}_2 ∧  b^{1, 914}_1 ∧  b^{1, 914}_0 ∧ true) 
c  in CNF:
c    -b^{1, 914}_2 ∨ -b^{1, 914}_1 ∨ -b^{1, 914}_0 ∨ false 
c  in DIMACS:
-3902 -3903 -3904  0

c i = 915
c  -2+1 --> -1
c    ( b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧  p_915) -> ( b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0)
c  in CNF:
c    -b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨  b^{1, 916}_2
c    -b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_1
c    -b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨  b^{1, 916}_0
c  in DIMACS:
-3905 -3906  3907 -915  3908 0
-3905 -3906  3907 -915 -3909 0
-3905 -3906  3907 -915  3910 0

c  -1+1 --> 0
c    ( b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0 ∧  p_915) -> (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧ -b^{1, 916}_0)
c  in CNF:
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_2
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_1
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_0
c  in DIMACS:
-3905  3906 -3907 -915 -3908 0
-3905  3906 -3907 -915 -3909 0
-3905  3906 -3907 -915 -3910 0

c  0+1 --> 1
c    (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧  p_915) -> (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0)
c  in CNF:
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_2
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_1
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨  b^{1, 916}_0
c  in DIMACS:
 3905  3906  3907 -915 -3908 0
 3905  3906  3907 -915 -3909 0
 3905  3906  3907 -915  3910 0

c  1+1 --> 2
c    (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0 ∧  p_915) -> (-b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0)
c  in CNF:
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_2
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨  b^{1, 916}_1
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ -p_915 ∨ -b^{1, 916}_0
c  in DIMACS:
 3905  3906 -3907 -915 -3908 0
 3905  3906 -3907 -915  3909 0
 3905  3906 -3907 -915 -3910 0

c  2+1 --> break 
c    (-b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧  p_915) -> break
c  in CNF:
c     b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 3905 -3906  3907 -915 1162 0


c  2-1 --> 1
c    (-b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧ -p_915) -> (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0)
c  in CNF:
c     b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_2
c     b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_1
c     b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨  b^{1, 916}_0
c  in DIMACS:
 3905 -3906  3907  915 -3908 0
 3905 -3906  3907  915 -3909 0
 3905 -3906  3907  915  3910 0

c  1-1 --> 0
c    (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0 ∧ -p_915) -> (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧ -b^{1, 916}_0)
c  in CNF:
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_2
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_1
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_0
c  in DIMACS:
 3905  3906 -3907  915 -3908 0
 3905  3906 -3907  915 -3909 0
 3905  3906 -3907  915 -3910 0

c  0-1 --> -1
c    (-b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧ -p_915) -> ( b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0)
c  in CNF:
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨  b^{1, 916}_2
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_1
c     b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨  b^{1, 916}_0
c  in DIMACS:
 3905  3906  3907  915  3908 0
 3905  3906  3907  915 -3909 0
 3905  3906  3907  915  3910 0

c  -1-1 --> -2
c    ( b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧  b^{1, 915}_0 ∧ -p_915) -> ( b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0)
c  in CNF:
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨  b^{1, 916}_2
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨  b^{1, 916}_1
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨  p_915 ∨ -b^{1, 916}_0
c  in DIMACS:
-3905  3906 -3907  915  3908 0
-3905  3906 -3907  915  3909 0
-3905  3906 -3907  915 -3910 0

c  -2-1 --> break 
c    ( b^{1, 915}_2 ∧  b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨  b^{1, 915}_0 ∨  p_915 ∨ break
c  in DIMACS:
-3905 -3906  3907  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 915}_2 ∧ -b^{1, 915}_1 ∧ -b^{1, 915}_0 ∧ true) 
c  in CNF:
c    -b^{1, 915}_2 ∨  b^{1, 915}_1 ∨  b^{1, 915}_0 ∨ false 
c  in DIMACS:
-3905  3906  3907  0

c  3 does not represent an automaton state.
c    -(-b^{1, 915}_2 ∧  b^{1, 915}_1 ∧  b^{1, 915}_0 ∧ true) 
c  in CNF:
c     b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ false 
c  in DIMACS:
 3905 -3906 -3907  0
c  -3 does not represent an automaton state.
c    -( b^{1, 915}_2 ∧  b^{1, 915}_1 ∧  b^{1, 915}_0 ∧ true) 
c  in CNF:
c    -b^{1, 915}_2 ∨ -b^{1, 915}_1 ∨ -b^{1, 915}_0 ∨ false 
c  in DIMACS:
-3905 -3906 -3907  0

c i = 916
c  -2+1 --> -1
c    ( b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧  p_916) -> ( b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0)
c  in CNF:
c    -b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨  b^{1, 917}_2
c    -b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_1
c    -b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨  b^{1, 917}_0
c  in DIMACS:
-3908 -3909  3910 -916  3911 0
-3908 -3909  3910 -916 -3912 0
-3908 -3909  3910 -916  3913 0

c  -1+1 --> 0
c    ( b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0 ∧  p_916) -> (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧ -b^{1, 917}_0)
c  in CNF:
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_2
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_1
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_0
c  in DIMACS:
-3908  3909 -3910 -916 -3911 0
-3908  3909 -3910 -916 -3912 0
-3908  3909 -3910 -916 -3913 0

c  0+1 --> 1
c    (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧  p_916) -> (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0)
c  in CNF:
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_2
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_1
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨  b^{1, 917}_0
c  in DIMACS:
 3908  3909  3910 -916 -3911 0
 3908  3909  3910 -916 -3912 0
 3908  3909  3910 -916  3913 0

c  1+1 --> 2
c    (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0 ∧  p_916) -> (-b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0)
c  in CNF:
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_2
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨  b^{1, 917}_1
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ -p_916 ∨ -b^{1, 917}_0
c  in DIMACS:
 3908  3909 -3910 -916 -3911 0
 3908  3909 -3910 -916  3912 0
 3908  3909 -3910 -916 -3913 0

c  2+1 --> break 
c    (-b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧  p_916) -> break
c  in CNF:
c     b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ -p_916 ∨ break
c  in DIMACS:
 3908 -3909  3910 -916 1162 0


c  2-1 --> 1
c    (-b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧ -p_916) -> (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0)
c  in CNF:
c     b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_2
c     b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_1
c     b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨  b^{1, 917}_0
c  in DIMACS:
 3908 -3909  3910  916 -3911 0
 3908 -3909  3910  916 -3912 0
 3908 -3909  3910  916  3913 0

c  1-1 --> 0
c    (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0 ∧ -p_916) -> (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧ -b^{1, 917}_0)
c  in CNF:
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_2
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_1
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_0
c  in DIMACS:
 3908  3909 -3910  916 -3911 0
 3908  3909 -3910  916 -3912 0
 3908  3909 -3910  916 -3913 0

c  0-1 --> -1
c    (-b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧ -p_916) -> ( b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0)
c  in CNF:
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨  b^{1, 917}_2
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_1
c     b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨  b^{1, 917}_0
c  in DIMACS:
 3908  3909  3910  916  3911 0
 3908  3909  3910  916 -3912 0
 3908  3909  3910  916  3913 0

c  -1-1 --> -2
c    ( b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧  b^{1, 916}_0 ∧ -p_916) -> ( b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0)
c  in CNF:
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨  b^{1, 917}_2
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨  b^{1, 917}_1
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨  p_916 ∨ -b^{1, 917}_0
c  in DIMACS:
-3908  3909 -3910  916  3911 0
-3908  3909 -3910  916  3912 0
-3908  3909 -3910  916 -3913 0

c  -2-1 --> break 
c    ( b^{1, 916}_2 ∧  b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧ -p_916) -> break
c  in CNF:
c    -b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨  b^{1, 916}_0 ∨  p_916 ∨ break
c  in DIMACS:
-3908 -3909  3910  916 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 916}_2 ∧ -b^{1, 916}_1 ∧ -b^{1, 916}_0 ∧ true) 
c  in CNF:
c    -b^{1, 916}_2 ∨  b^{1, 916}_1 ∨  b^{1, 916}_0 ∨ false 
c  in DIMACS:
-3908  3909  3910  0

c  3 does not represent an automaton state.
c    -(-b^{1, 916}_2 ∧  b^{1, 916}_1 ∧  b^{1, 916}_0 ∧ true) 
c  in CNF:
c     b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ false 
c  in DIMACS:
 3908 -3909 -3910  0
c  -3 does not represent an automaton state.
c    -( b^{1, 916}_2 ∧  b^{1, 916}_1 ∧  b^{1, 916}_0 ∧ true) 
c  in CNF:
c    -b^{1, 916}_2 ∨ -b^{1, 916}_1 ∨ -b^{1, 916}_0 ∨ false 
c  in DIMACS:
-3908 -3909 -3910  0

c i = 917
c  -2+1 --> -1
c    ( b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧  p_917) -> ( b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0)
c  in CNF:
c    -b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨  b^{1, 918}_2
c    -b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_1
c    -b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨  b^{1, 918}_0
c  in DIMACS:
-3911 -3912  3913 -917  3914 0
-3911 -3912  3913 -917 -3915 0
-3911 -3912  3913 -917  3916 0

c  -1+1 --> 0
c    ( b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0 ∧  p_917) -> (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧ -b^{1, 918}_0)
c  in CNF:
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_2
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_1
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_0
c  in DIMACS:
-3911  3912 -3913 -917 -3914 0
-3911  3912 -3913 -917 -3915 0
-3911  3912 -3913 -917 -3916 0

c  0+1 --> 1
c    (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧  p_917) -> (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0)
c  in CNF:
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_2
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_1
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨  b^{1, 918}_0
c  in DIMACS:
 3911  3912  3913 -917 -3914 0
 3911  3912  3913 -917 -3915 0
 3911  3912  3913 -917  3916 0

c  1+1 --> 2
c    (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0 ∧  p_917) -> (-b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0)
c  in CNF:
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_2
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨  b^{1, 918}_1
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ -p_917 ∨ -b^{1, 918}_0
c  in DIMACS:
 3911  3912 -3913 -917 -3914 0
 3911  3912 -3913 -917  3915 0
 3911  3912 -3913 -917 -3916 0

c  2+1 --> break 
c    (-b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧  p_917) -> break
c  in CNF:
c     b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ -p_917 ∨ break
c  in DIMACS:
 3911 -3912  3913 -917 1162 0


c  2-1 --> 1
c    (-b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧ -p_917) -> (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0)
c  in CNF:
c     b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_2
c     b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_1
c     b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨  b^{1, 918}_0
c  in DIMACS:
 3911 -3912  3913  917 -3914 0
 3911 -3912  3913  917 -3915 0
 3911 -3912  3913  917  3916 0

c  1-1 --> 0
c    (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0 ∧ -p_917) -> (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧ -b^{1, 918}_0)
c  in CNF:
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_2
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_1
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_0
c  in DIMACS:
 3911  3912 -3913  917 -3914 0
 3911  3912 -3913  917 -3915 0
 3911  3912 -3913  917 -3916 0

c  0-1 --> -1
c    (-b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧ -p_917) -> ( b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0)
c  in CNF:
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨  b^{1, 918}_2
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_1
c     b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨  b^{1, 918}_0
c  in DIMACS:
 3911  3912  3913  917  3914 0
 3911  3912  3913  917 -3915 0
 3911  3912  3913  917  3916 0

c  -1-1 --> -2
c    ( b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧  b^{1, 917}_0 ∧ -p_917) -> ( b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0)
c  in CNF:
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨  b^{1, 918}_2
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨  b^{1, 918}_1
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨  p_917 ∨ -b^{1, 918}_0
c  in DIMACS:
-3911  3912 -3913  917  3914 0
-3911  3912 -3913  917  3915 0
-3911  3912 -3913  917 -3916 0

c  -2-1 --> break 
c    ( b^{1, 917}_2 ∧  b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧ -p_917) -> break
c  in CNF:
c    -b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨  b^{1, 917}_0 ∨  p_917 ∨ break
c  in DIMACS:
-3911 -3912  3913  917 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 917}_2 ∧ -b^{1, 917}_1 ∧ -b^{1, 917}_0 ∧ true) 
c  in CNF:
c    -b^{1, 917}_2 ∨  b^{1, 917}_1 ∨  b^{1, 917}_0 ∨ false 
c  in DIMACS:
-3911  3912  3913  0

c  3 does not represent an automaton state.
c    -(-b^{1, 917}_2 ∧  b^{1, 917}_1 ∧  b^{1, 917}_0 ∧ true) 
c  in CNF:
c     b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ false 
c  in DIMACS:
 3911 -3912 -3913  0
c  -3 does not represent an automaton state.
c    -( b^{1, 917}_2 ∧  b^{1, 917}_1 ∧  b^{1, 917}_0 ∧ true) 
c  in CNF:
c    -b^{1, 917}_2 ∨ -b^{1, 917}_1 ∨ -b^{1, 917}_0 ∨ false 
c  in DIMACS:
-3911 -3912 -3913  0

c i = 918
c  -2+1 --> -1
c    ( b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧  p_918) -> ( b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0)
c  in CNF:
c    -b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨  b^{1, 919}_2
c    -b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_1
c    -b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨  b^{1, 919}_0
c  in DIMACS:
-3914 -3915  3916 -918  3917 0
-3914 -3915  3916 -918 -3918 0
-3914 -3915  3916 -918  3919 0

c  -1+1 --> 0
c    ( b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0 ∧  p_918) -> (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧ -b^{1, 919}_0)
c  in CNF:
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_2
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_1
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_0
c  in DIMACS:
-3914  3915 -3916 -918 -3917 0
-3914  3915 -3916 -918 -3918 0
-3914  3915 -3916 -918 -3919 0

c  0+1 --> 1
c    (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧  p_918) -> (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0)
c  in CNF:
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_2
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_1
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨  b^{1, 919}_0
c  in DIMACS:
 3914  3915  3916 -918 -3917 0
 3914  3915  3916 -918 -3918 0
 3914  3915  3916 -918  3919 0

c  1+1 --> 2
c    (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0 ∧  p_918) -> (-b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0)
c  in CNF:
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_2
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨  b^{1, 919}_1
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ -p_918 ∨ -b^{1, 919}_0
c  in DIMACS:
 3914  3915 -3916 -918 -3917 0
 3914  3915 -3916 -918  3918 0
 3914  3915 -3916 -918 -3919 0

c  2+1 --> break 
c    (-b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧  p_918) -> break
c  in CNF:
c     b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 3914 -3915  3916 -918 1162 0


c  2-1 --> 1
c    (-b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧ -p_918) -> (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0)
c  in CNF:
c     b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_2
c     b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_1
c     b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨  b^{1, 919}_0
c  in DIMACS:
 3914 -3915  3916  918 -3917 0
 3914 -3915  3916  918 -3918 0
 3914 -3915  3916  918  3919 0

c  1-1 --> 0
c    (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0 ∧ -p_918) -> (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧ -b^{1, 919}_0)
c  in CNF:
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_2
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_1
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_0
c  in DIMACS:
 3914  3915 -3916  918 -3917 0
 3914  3915 -3916  918 -3918 0
 3914  3915 -3916  918 -3919 0

c  0-1 --> -1
c    (-b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧ -p_918) -> ( b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0)
c  in CNF:
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨  b^{1, 919}_2
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_1
c     b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨  b^{1, 919}_0
c  in DIMACS:
 3914  3915  3916  918  3917 0
 3914  3915  3916  918 -3918 0
 3914  3915  3916  918  3919 0

c  -1-1 --> -2
c    ( b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧  b^{1, 918}_0 ∧ -p_918) -> ( b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0)
c  in CNF:
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨  b^{1, 919}_2
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨  b^{1, 919}_1
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨  p_918 ∨ -b^{1, 919}_0
c  in DIMACS:
-3914  3915 -3916  918  3917 0
-3914  3915 -3916  918  3918 0
-3914  3915 -3916  918 -3919 0

c  -2-1 --> break 
c    ( b^{1, 918}_2 ∧  b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨  b^{1, 918}_0 ∨  p_918 ∨ break
c  in DIMACS:
-3914 -3915  3916  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 918}_2 ∧ -b^{1, 918}_1 ∧ -b^{1, 918}_0 ∧ true) 
c  in CNF:
c    -b^{1, 918}_2 ∨  b^{1, 918}_1 ∨  b^{1, 918}_0 ∨ false 
c  in DIMACS:
-3914  3915  3916  0

c  3 does not represent an automaton state.
c    -(-b^{1, 918}_2 ∧  b^{1, 918}_1 ∧  b^{1, 918}_0 ∧ true) 
c  in CNF:
c     b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ false 
c  in DIMACS:
 3914 -3915 -3916  0
c  -3 does not represent an automaton state.
c    -( b^{1, 918}_2 ∧  b^{1, 918}_1 ∧  b^{1, 918}_0 ∧ true) 
c  in CNF:
c    -b^{1, 918}_2 ∨ -b^{1, 918}_1 ∨ -b^{1, 918}_0 ∨ false 
c  in DIMACS:
-3914 -3915 -3916  0

c i = 919
c  -2+1 --> -1
c    ( b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧  p_919) -> ( b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0)
c  in CNF:
c    -b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨  b^{1, 920}_2
c    -b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_1
c    -b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨  b^{1, 920}_0
c  in DIMACS:
-3917 -3918  3919 -919  3920 0
-3917 -3918  3919 -919 -3921 0
-3917 -3918  3919 -919  3922 0

c  -1+1 --> 0
c    ( b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0 ∧  p_919) -> (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧ -b^{1, 920}_0)
c  in CNF:
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_2
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_1
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_0
c  in DIMACS:
-3917  3918 -3919 -919 -3920 0
-3917  3918 -3919 -919 -3921 0
-3917  3918 -3919 -919 -3922 0

c  0+1 --> 1
c    (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧  p_919) -> (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0)
c  in CNF:
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_2
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_1
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨  b^{1, 920}_0
c  in DIMACS:
 3917  3918  3919 -919 -3920 0
 3917  3918  3919 -919 -3921 0
 3917  3918  3919 -919  3922 0

c  1+1 --> 2
c    (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0 ∧  p_919) -> (-b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0)
c  in CNF:
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_2
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨  b^{1, 920}_1
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ -p_919 ∨ -b^{1, 920}_0
c  in DIMACS:
 3917  3918 -3919 -919 -3920 0
 3917  3918 -3919 -919  3921 0
 3917  3918 -3919 -919 -3922 0

c  2+1 --> break 
c    (-b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧  p_919) -> break
c  in CNF:
c     b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ -p_919 ∨ break
c  in DIMACS:
 3917 -3918  3919 -919 1162 0


c  2-1 --> 1
c    (-b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧ -p_919) -> (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0)
c  in CNF:
c     b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_2
c     b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_1
c     b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨  b^{1, 920}_0
c  in DIMACS:
 3917 -3918  3919  919 -3920 0
 3917 -3918  3919  919 -3921 0
 3917 -3918  3919  919  3922 0

c  1-1 --> 0
c    (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0 ∧ -p_919) -> (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧ -b^{1, 920}_0)
c  in CNF:
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_2
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_1
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_0
c  in DIMACS:
 3917  3918 -3919  919 -3920 0
 3917  3918 -3919  919 -3921 0
 3917  3918 -3919  919 -3922 0

c  0-1 --> -1
c    (-b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧ -p_919) -> ( b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0)
c  in CNF:
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨  b^{1, 920}_2
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_1
c     b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨  b^{1, 920}_0
c  in DIMACS:
 3917  3918  3919  919  3920 0
 3917  3918  3919  919 -3921 0
 3917  3918  3919  919  3922 0

c  -1-1 --> -2
c    ( b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧  b^{1, 919}_0 ∧ -p_919) -> ( b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0)
c  in CNF:
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨  b^{1, 920}_2
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨  b^{1, 920}_1
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨  p_919 ∨ -b^{1, 920}_0
c  in DIMACS:
-3917  3918 -3919  919  3920 0
-3917  3918 -3919  919  3921 0
-3917  3918 -3919  919 -3922 0

c  -2-1 --> break 
c    ( b^{1, 919}_2 ∧  b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧ -p_919) -> break
c  in CNF:
c    -b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨  b^{1, 919}_0 ∨  p_919 ∨ break
c  in DIMACS:
-3917 -3918  3919  919 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 919}_2 ∧ -b^{1, 919}_1 ∧ -b^{1, 919}_0 ∧ true) 
c  in CNF:
c    -b^{1, 919}_2 ∨  b^{1, 919}_1 ∨  b^{1, 919}_0 ∨ false 
c  in DIMACS:
-3917  3918  3919  0

c  3 does not represent an automaton state.
c    -(-b^{1, 919}_2 ∧  b^{1, 919}_1 ∧  b^{1, 919}_0 ∧ true) 
c  in CNF:
c     b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ false 
c  in DIMACS:
 3917 -3918 -3919  0
c  -3 does not represent an automaton state.
c    -( b^{1, 919}_2 ∧  b^{1, 919}_1 ∧  b^{1, 919}_0 ∧ true) 
c  in CNF:
c    -b^{1, 919}_2 ∨ -b^{1, 919}_1 ∨ -b^{1, 919}_0 ∨ false 
c  in DIMACS:
-3917 -3918 -3919  0

c i = 920
c  -2+1 --> -1
c    ( b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧  p_920) -> ( b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0)
c  in CNF:
c    -b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨  b^{1, 921}_2
c    -b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_1
c    -b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨  b^{1, 921}_0
c  in DIMACS:
-3920 -3921  3922 -920  3923 0
-3920 -3921  3922 -920 -3924 0
-3920 -3921  3922 -920  3925 0

c  -1+1 --> 0
c    ( b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0 ∧  p_920) -> (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧ -b^{1, 921}_0)
c  in CNF:
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_2
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_1
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_0
c  in DIMACS:
-3920  3921 -3922 -920 -3923 0
-3920  3921 -3922 -920 -3924 0
-3920  3921 -3922 -920 -3925 0

c  0+1 --> 1
c    (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧  p_920) -> (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0)
c  in CNF:
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_2
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_1
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨  b^{1, 921}_0
c  in DIMACS:
 3920  3921  3922 -920 -3923 0
 3920  3921  3922 -920 -3924 0
 3920  3921  3922 -920  3925 0

c  1+1 --> 2
c    (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0 ∧  p_920) -> (-b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0)
c  in CNF:
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_2
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨  b^{1, 921}_1
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ -p_920 ∨ -b^{1, 921}_0
c  in DIMACS:
 3920  3921 -3922 -920 -3923 0
 3920  3921 -3922 -920  3924 0
 3920  3921 -3922 -920 -3925 0

c  2+1 --> break 
c    (-b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧  p_920) -> break
c  in CNF:
c     b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 3920 -3921  3922 -920 1162 0


c  2-1 --> 1
c    (-b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧ -p_920) -> (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0)
c  in CNF:
c     b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_2
c     b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_1
c     b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨  b^{1, 921}_0
c  in DIMACS:
 3920 -3921  3922  920 -3923 0
 3920 -3921  3922  920 -3924 0
 3920 -3921  3922  920  3925 0

c  1-1 --> 0
c    (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0 ∧ -p_920) -> (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧ -b^{1, 921}_0)
c  in CNF:
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_2
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_1
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_0
c  in DIMACS:
 3920  3921 -3922  920 -3923 0
 3920  3921 -3922  920 -3924 0
 3920  3921 -3922  920 -3925 0

c  0-1 --> -1
c    (-b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧ -p_920) -> ( b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0)
c  in CNF:
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨  b^{1, 921}_2
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_1
c     b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨  b^{1, 921}_0
c  in DIMACS:
 3920  3921  3922  920  3923 0
 3920  3921  3922  920 -3924 0
 3920  3921  3922  920  3925 0

c  -1-1 --> -2
c    ( b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧  b^{1, 920}_0 ∧ -p_920) -> ( b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0)
c  in CNF:
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨  b^{1, 921}_2
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨  b^{1, 921}_1
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨  p_920 ∨ -b^{1, 921}_0
c  in DIMACS:
-3920  3921 -3922  920  3923 0
-3920  3921 -3922  920  3924 0
-3920  3921 -3922  920 -3925 0

c  -2-1 --> break 
c    ( b^{1, 920}_2 ∧  b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨  b^{1, 920}_0 ∨  p_920 ∨ break
c  in DIMACS:
-3920 -3921  3922  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 920}_2 ∧ -b^{1, 920}_1 ∧ -b^{1, 920}_0 ∧ true) 
c  in CNF:
c    -b^{1, 920}_2 ∨  b^{1, 920}_1 ∨  b^{1, 920}_0 ∨ false 
c  in DIMACS:
-3920  3921  3922  0

c  3 does not represent an automaton state.
c    -(-b^{1, 920}_2 ∧  b^{1, 920}_1 ∧  b^{1, 920}_0 ∧ true) 
c  in CNF:
c     b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ false 
c  in DIMACS:
 3920 -3921 -3922  0
c  -3 does not represent an automaton state.
c    -( b^{1, 920}_2 ∧  b^{1, 920}_1 ∧  b^{1, 920}_0 ∧ true) 
c  in CNF:
c    -b^{1, 920}_2 ∨ -b^{1, 920}_1 ∨ -b^{1, 920}_0 ∨ false 
c  in DIMACS:
-3920 -3921 -3922  0

c i = 921
c  -2+1 --> -1
c    ( b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧  p_921) -> ( b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0)
c  in CNF:
c    -b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨  b^{1, 922}_2
c    -b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_1
c    -b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨  b^{1, 922}_0
c  in DIMACS:
-3923 -3924  3925 -921  3926 0
-3923 -3924  3925 -921 -3927 0
-3923 -3924  3925 -921  3928 0

c  -1+1 --> 0
c    ( b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0 ∧  p_921) -> (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧ -b^{1, 922}_0)
c  in CNF:
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_2
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_1
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_0
c  in DIMACS:
-3923  3924 -3925 -921 -3926 0
-3923  3924 -3925 -921 -3927 0
-3923  3924 -3925 -921 -3928 0

c  0+1 --> 1
c    (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧  p_921) -> (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0)
c  in CNF:
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_2
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_1
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨  b^{1, 922}_0
c  in DIMACS:
 3923  3924  3925 -921 -3926 0
 3923  3924  3925 -921 -3927 0
 3923  3924  3925 -921  3928 0

c  1+1 --> 2
c    (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0 ∧  p_921) -> (-b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0)
c  in CNF:
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_2
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨  b^{1, 922}_1
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ -p_921 ∨ -b^{1, 922}_0
c  in DIMACS:
 3923  3924 -3925 -921 -3926 0
 3923  3924 -3925 -921  3927 0
 3923  3924 -3925 -921 -3928 0

c  2+1 --> break 
c    (-b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧  p_921) -> break
c  in CNF:
c     b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ -p_921 ∨ break
c  in DIMACS:
 3923 -3924  3925 -921 1162 0


c  2-1 --> 1
c    (-b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧ -p_921) -> (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0)
c  in CNF:
c     b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_2
c     b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_1
c     b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨  b^{1, 922}_0
c  in DIMACS:
 3923 -3924  3925  921 -3926 0
 3923 -3924  3925  921 -3927 0
 3923 -3924  3925  921  3928 0

c  1-1 --> 0
c    (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0 ∧ -p_921) -> (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧ -b^{1, 922}_0)
c  in CNF:
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_2
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_1
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_0
c  in DIMACS:
 3923  3924 -3925  921 -3926 0
 3923  3924 -3925  921 -3927 0
 3923  3924 -3925  921 -3928 0

c  0-1 --> -1
c    (-b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧ -p_921) -> ( b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0)
c  in CNF:
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨  b^{1, 922}_2
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_1
c     b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨  b^{1, 922}_0
c  in DIMACS:
 3923  3924  3925  921  3926 0
 3923  3924  3925  921 -3927 0
 3923  3924  3925  921  3928 0

c  -1-1 --> -2
c    ( b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧  b^{1, 921}_0 ∧ -p_921) -> ( b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0)
c  in CNF:
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨  b^{1, 922}_2
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨  b^{1, 922}_1
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨  p_921 ∨ -b^{1, 922}_0
c  in DIMACS:
-3923  3924 -3925  921  3926 0
-3923  3924 -3925  921  3927 0
-3923  3924 -3925  921 -3928 0

c  -2-1 --> break 
c    ( b^{1, 921}_2 ∧  b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧ -p_921) -> break
c  in CNF:
c    -b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨  b^{1, 921}_0 ∨  p_921 ∨ break
c  in DIMACS:
-3923 -3924  3925  921 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 921}_2 ∧ -b^{1, 921}_1 ∧ -b^{1, 921}_0 ∧ true) 
c  in CNF:
c    -b^{1, 921}_2 ∨  b^{1, 921}_1 ∨  b^{1, 921}_0 ∨ false 
c  in DIMACS:
-3923  3924  3925  0

c  3 does not represent an automaton state.
c    -(-b^{1, 921}_2 ∧  b^{1, 921}_1 ∧  b^{1, 921}_0 ∧ true) 
c  in CNF:
c     b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ false 
c  in DIMACS:
 3923 -3924 -3925  0
c  -3 does not represent an automaton state.
c    -( b^{1, 921}_2 ∧  b^{1, 921}_1 ∧  b^{1, 921}_0 ∧ true) 
c  in CNF:
c    -b^{1, 921}_2 ∨ -b^{1, 921}_1 ∨ -b^{1, 921}_0 ∨ false 
c  in DIMACS:
-3923 -3924 -3925  0

c i = 922
c  -2+1 --> -1
c    ( b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧  p_922) -> ( b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0)
c  in CNF:
c    -b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨  b^{1, 923}_2
c    -b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_1
c    -b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨  b^{1, 923}_0
c  in DIMACS:
-3926 -3927  3928 -922  3929 0
-3926 -3927  3928 -922 -3930 0
-3926 -3927  3928 -922  3931 0

c  -1+1 --> 0
c    ( b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0 ∧  p_922) -> (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧ -b^{1, 923}_0)
c  in CNF:
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_2
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_1
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_0
c  in DIMACS:
-3926  3927 -3928 -922 -3929 0
-3926  3927 -3928 -922 -3930 0
-3926  3927 -3928 -922 -3931 0

c  0+1 --> 1
c    (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧  p_922) -> (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0)
c  in CNF:
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_2
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_1
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨  b^{1, 923}_0
c  in DIMACS:
 3926  3927  3928 -922 -3929 0
 3926  3927  3928 -922 -3930 0
 3926  3927  3928 -922  3931 0

c  1+1 --> 2
c    (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0 ∧  p_922) -> (-b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0)
c  in CNF:
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_2
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨  b^{1, 923}_1
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ -p_922 ∨ -b^{1, 923}_0
c  in DIMACS:
 3926  3927 -3928 -922 -3929 0
 3926  3927 -3928 -922  3930 0
 3926  3927 -3928 -922 -3931 0

c  2+1 --> break 
c    (-b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧  p_922) -> break
c  in CNF:
c     b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ -p_922 ∨ break
c  in DIMACS:
 3926 -3927  3928 -922 1162 0


c  2-1 --> 1
c    (-b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧ -p_922) -> (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0)
c  in CNF:
c     b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_2
c     b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_1
c     b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨  b^{1, 923}_0
c  in DIMACS:
 3926 -3927  3928  922 -3929 0
 3926 -3927  3928  922 -3930 0
 3926 -3927  3928  922  3931 0

c  1-1 --> 0
c    (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0 ∧ -p_922) -> (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧ -b^{1, 923}_0)
c  in CNF:
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_2
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_1
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_0
c  in DIMACS:
 3926  3927 -3928  922 -3929 0
 3926  3927 -3928  922 -3930 0
 3926  3927 -3928  922 -3931 0

c  0-1 --> -1
c    (-b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧ -p_922) -> ( b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0)
c  in CNF:
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨  b^{1, 923}_2
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_1
c     b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨  b^{1, 923}_0
c  in DIMACS:
 3926  3927  3928  922  3929 0
 3926  3927  3928  922 -3930 0
 3926  3927  3928  922  3931 0

c  -1-1 --> -2
c    ( b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧  b^{1, 922}_0 ∧ -p_922) -> ( b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0)
c  in CNF:
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨  b^{1, 923}_2
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨  b^{1, 923}_1
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨  p_922 ∨ -b^{1, 923}_0
c  in DIMACS:
-3926  3927 -3928  922  3929 0
-3926  3927 -3928  922  3930 0
-3926  3927 -3928  922 -3931 0

c  -2-1 --> break 
c    ( b^{1, 922}_2 ∧  b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧ -p_922) -> break
c  in CNF:
c    -b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨  b^{1, 922}_0 ∨  p_922 ∨ break
c  in DIMACS:
-3926 -3927  3928  922 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 922}_2 ∧ -b^{1, 922}_1 ∧ -b^{1, 922}_0 ∧ true) 
c  in CNF:
c    -b^{1, 922}_2 ∨  b^{1, 922}_1 ∨  b^{1, 922}_0 ∨ false 
c  in DIMACS:
-3926  3927  3928  0

c  3 does not represent an automaton state.
c    -(-b^{1, 922}_2 ∧  b^{1, 922}_1 ∧  b^{1, 922}_0 ∧ true) 
c  in CNF:
c     b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ false 
c  in DIMACS:
 3926 -3927 -3928  0
c  -3 does not represent an automaton state.
c    -( b^{1, 922}_2 ∧  b^{1, 922}_1 ∧  b^{1, 922}_0 ∧ true) 
c  in CNF:
c    -b^{1, 922}_2 ∨ -b^{1, 922}_1 ∨ -b^{1, 922}_0 ∨ false 
c  in DIMACS:
-3926 -3927 -3928  0

c i = 923
c  -2+1 --> -1
c    ( b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧  p_923) -> ( b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0)
c  in CNF:
c    -b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨  b^{1, 924}_2
c    -b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_1
c    -b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨  b^{1, 924}_0
c  in DIMACS:
-3929 -3930  3931 -923  3932 0
-3929 -3930  3931 -923 -3933 0
-3929 -3930  3931 -923  3934 0

c  -1+1 --> 0
c    ( b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0 ∧  p_923) -> (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧ -b^{1, 924}_0)
c  in CNF:
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_2
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_1
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_0
c  in DIMACS:
-3929  3930 -3931 -923 -3932 0
-3929  3930 -3931 -923 -3933 0
-3929  3930 -3931 -923 -3934 0

c  0+1 --> 1
c    (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧  p_923) -> (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0)
c  in CNF:
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_2
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_1
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨  b^{1, 924}_0
c  in DIMACS:
 3929  3930  3931 -923 -3932 0
 3929  3930  3931 -923 -3933 0
 3929  3930  3931 -923  3934 0

c  1+1 --> 2
c    (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0 ∧  p_923) -> (-b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0)
c  in CNF:
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_2
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨  b^{1, 924}_1
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ -p_923 ∨ -b^{1, 924}_0
c  in DIMACS:
 3929  3930 -3931 -923 -3932 0
 3929  3930 -3931 -923  3933 0
 3929  3930 -3931 -923 -3934 0

c  2+1 --> break 
c    (-b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧  p_923) -> break
c  in CNF:
c     b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ -p_923 ∨ break
c  in DIMACS:
 3929 -3930  3931 -923 1162 0


c  2-1 --> 1
c    (-b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧ -p_923) -> (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0)
c  in CNF:
c     b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_2
c     b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_1
c     b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨  b^{1, 924}_0
c  in DIMACS:
 3929 -3930  3931  923 -3932 0
 3929 -3930  3931  923 -3933 0
 3929 -3930  3931  923  3934 0

c  1-1 --> 0
c    (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0 ∧ -p_923) -> (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧ -b^{1, 924}_0)
c  in CNF:
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_2
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_1
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_0
c  in DIMACS:
 3929  3930 -3931  923 -3932 0
 3929  3930 -3931  923 -3933 0
 3929  3930 -3931  923 -3934 0

c  0-1 --> -1
c    (-b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧ -p_923) -> ( b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0)
c  in CNF:
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨  b^{1, 924}_2
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_1
c     b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨  b^{1, 924}_0
c  in DIMACS:
 3929  3930  3931  923  3932 0
 3929  3930  3931  923 -3933 0
 3929  3930  3931  923  3934 0

c  -1-1 --> -2
c    ( b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧  b^{1, 923}_0 ∧ -p_923) -> ( b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0)
c  in CNF:
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨  b^{1, 924}_2
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨  b^{1, 924}_1
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨  p_923 ∨ -b^{1, 924}_0
c  in DIMACS:
-3929  3930 -3931  923  3932 0
-3929  3930 -3931  923  3933 0
-3929  3930 -3931  923 -3934 0

c  -2-1 --> break 
c    ( b^{1, 923}_2 ∧  b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧ -p_923) -> break
c  in CNF:
c    -b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨  b^{1, 923}_0 ∨  p_923 ∨ break
c  in DIMACS:
-3929 -3930  3931  923 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 923}_2 ∧ -b^{1, 923}_1 ∧ -b^{1, 923}_0 ∧ true) 
c  in CNF:
c    -b^{1, 923}_2 ∨  b^{1, 923}_1 ∨  b^{1, 923}_0 ∨ false 
c  in DIMACS:
-3929  3930  3931  0

c  3 does not represent an automaton state.
c    -(-b^{1, 923}_2 ∧  b^{1, 923}_1 ∧  b^{1, 923}_0 ∧ true) 
c  in CNF:
c     b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ false 
c  in DIMACS:
 3929 -3930 -3931  0
c  -3 does not represent an automaton state.
c    -( b^{1, 923}_2 ∧  b^{1, 923}_1 ∧  b^{1, 923}_0 ∧ true) 
c  in CNF:
c    -b^{1, 923}_2 ∨ -b^{1, 923}_1 ∨ -b^{1, 923}_0 ∨ false 
c  in DIMACS:
-3929 -3930 -3931  0

c i = 924
c  -2+1 --> -1
c    ( b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧  p_924) -> ( b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0)
c  in CNF:
c    -b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨  b^{1, 925}_2
c    -b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_1
c    -b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨  b^{1, 925}_0
c  in DIMACS:
-3932 -3933  3934 -924  3935 0
-3932 -3933  3934 -924 -3936 0
-3932 -3933  3934 -924  3937 0

c  -1+1 --> 0
c    ( b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0 ∧  p_924) -> (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧ -b^{1, 925}_0)
c  in CNF:
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_2
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_1
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_0
c  in DIMACS:
-3932  3933 -3934 -924 -3935 0
-3932  3933 -3934 -924 -3936 0
-3932  3933 -3934 -924 -3937 0

c  0+1 --> 1
c    (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧  p_924) -> (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0)
c  in CNF:
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_2
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_1
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨  b^{1, 925}_0
c  in DIMACS:
 3932  3933  3934 -924 -3935 0
 3932  3933  3934 -924 -3936 0
 3932  3933  3934 -924  3937 0

c  1+1 --> 2
c    (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0 ∧  p_924) -> (-b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0)
c  in CNF:
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_2
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨  b^{1, 925}_1
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ -p_924 ∨ -b^{1, 925}_0
c  in DIMACS:
 3932  3933 -3934 -924 -3935 0
 3932  3933 -3934 -924  3936 0
 3932  3933 -3934 -924 -3937 0

c  2+1 --> break 
c    (-b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧  p_924) -> break
c  in CNF:
c     b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 3932 -3933  3934 -924 1162 0


c  2-1 --> 1
c    (-b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧ -p_924) -> (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0)
c  in CNF:
c     b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_2
c     b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_1
c     b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨  b^{1, 925}_0
c  in DIMACS:
 3932 -3933  3934  924 -3935 0
 3932 -3933  3934  924 -3936 0
 3932 -3933  3934  924  3937 0

c  1-1 --> 0
c    (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0 ∧ -p_924) -> (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧ -b^{1, 925}_0)
c  in CNF:
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_2
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_1
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_0
c  in DIMACS:
 3932  3933 -3934  924 -3935 0
 3932  3933 -3934  924 -3936 0
 3932  3933 -3934  924 -3937 0

c  0-1 --> -1
c    (-b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧ -p_924) -> ( b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0)
c  in CNF:
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨  b^{1, 925}_2
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_1
c     b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨  b^{1, 925}_0
c  in DIMACS:
 3932  3933  3934  924  3935 0
 3932  3933  3934  924 -3936 0
 3932  3933  3934  924  3937 0

c  -1-1 --> -2
c    ( b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧  b^{1, 924}_0 ∧ -p_924) -> ( b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0)
c  in CNF:
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨  b^{1, 925}_2
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨  b^{1, 925}_1
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨  p_924 ∨ -b^{1, 925}_0
c  in DIMACS:
-3932  3933 -3934  924  3935 0
-3932  3933 -3934  924  3936 0
-3932  3933 -3934  924 -3937 0

c  -2-1 --> break 
c    ( b^{1, 924}_2 ∧  b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨  b^{1, 924}_0 ∨  p_924 ∨ break
c  in DIMACS:
-3932 -3933  3934  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 924}_2 ∧ -b^{1, 924}_1 ∧ -b^{1, 924}_0 ∧ true) 
c  in CNF:
c    -b^{1, 924}_2 ∨  b^{1, 924}_1 ∨  b^{1, 924}_0 ∨ false 
c  in DIMACS:
-3932  3933  3934  0

c  3 does not represent an automaton state.
c    -(-b^{1, 924}_2 ∧  b^{1, 924}_1 ∧  b^{1, 924}_0 ∧ true) 
c  in CNF:
c     b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ false 
c  in DIMACS:
 3932 -3933 -3934  0
c  -3 does not represent an automaton state.
c    -( b^{1, 924}_2 ∧  b^{1, 924}_1 ∧  b^{1, 924}_0 ∧ true) 
c  in CNF:
c    -b^{1, 924}_2 ∨ -b^{1, 924}_1 ∨ -b^{1, 924}_0 ∨ false 
c  in DIMACS:
-3932 -3933 -3934  0

c i = 925
c  -2+1 --> -1
c    ( b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧  p_925) -> ( b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0)
c  in CNF:
c    -b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨  b^{1, 926}_2
c    -b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_1
c    -b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨  b^{1, 926}_0
c  in DIMACS:
-3935 -3936  3937 -925  3938 0
-3935 -3936  3937 -925 -3939 0
-3935 -3936  3937 -925  3940 0

c  -1+1 --> 0
c    ( b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0 ∧  p_925) -> (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧ -b^{1, 926}_0)
c  in CNF:
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_2
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_1
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_0
c  in DIMACS:
-3935  3936 -3937 -925 -3938 0
-3935  3936 -3937 -925 -3939 0
-3935  3936 -3937 -925 -3940 0

c  0+1 --> 1
c    (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧  p_925) -> (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0)
c  in CNF:
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_2
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_1
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨  b^{1, 926}_0
c  in DIMACS:
 3935  3936  3937 -925 -3938 0
 3935  3936  3937 -925 -3939 0
 3935  3936  3937 -925  3940 0

c  1+1 --> 2
c    (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0 ∧  p_925) -> (-b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0)
c  in CNF:
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_2
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨  b^{1, 926}_1
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ -p_925 ∨ -b^{1, 926}_0
c  in DIMACS:
 3935  3936 -3937 -925 -3938 0
 3935  3936 -3937 -925  3939 0
 3935  3936 -3937 -925 -3940 0

c  2+1 --> break 
c    (-b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧  p_925) -> break
c  in CNF:
c     b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ -p_925 ∨ break
c  in DIMACS:
 3935 -3936  3937 -925 1162 0


c  2-1 --> 1
c    (-b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧ -p_925) -> (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0)
c  in CNF:
c     b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_2
c     b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_1
c     b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨  b^{1, 926}_0
c  in DIMACS:
 3935 -3936  3937  925 -3938 0
 3935 -3936  3937  925 -3939 0
 3935 -3936  3937  925  3940 0

c  1-1 --> 0
c    (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0 ∧ -p_925) -> (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧ -b^{1, 926}_0)
c  in CNF:
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_2
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_1
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_0
c  in DIMACS:
 3935  3936 -3937  925 -3938 0
 3935  3936 -3937  925 -3939 0
 3935  3936 -3937  925 -3940 0

c  0-1 --> -1
c    (-b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧ -p_925) -> ( b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0)
c  in CNF:
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨  b^{1, 926}_2
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_1
c     b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨  b^{1, 926}_0
c  in DIMACS:
 3935  3936  3937  925  3938 0
 3935  3936  3937  925 -3939 0
 3935  3936  3937  925  3940 0

c  -1-1 --> -2
c    ( b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧  b^{1, 925}_0 ∧ -p_925) -> ( b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0)
c  in CNF:
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨  b^{1, 926}_2
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨  b^{1, 926}_1
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨  p_925 ∨ -b^{1, 926}_0
c  in DIMACS:
-3935  3936 -3937  925  3938 0
-3935  3936 -3937  925  3939 0
-3935  3936 -3937  925 -3940 0

c  -2-1 --> break 
c    ( b^{1, 925}_2 ∧  b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧ -p_925) -> break
c  in CNF:
c    -b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨  b^{1, 925}_0 ∨  p_925 ∨ break
c  in DIMACS:
-3935 -3936  3937  925 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 925}_2 ∧ -b^{1, 925}_1 ∧ -b^{1, 925}_0 ∧ true) 
c  in CNF:
c    -b^{1, 925}_2 ∨  b^{1, 925}_1 ∨  b^{1, 925}_0 ∨ false 
c  in DIMACS:
-3935  3936  3937  0

c  3 does not represent an automaton state.
c    -(-b^{1, 925}_2 ∧  b^{1, 925}_1 ∧  b^{1, 925}_0 ∧ true) 
c  in CNF:
c     b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ false 
c  in DIMACS:
 3935 -3936 -3937  0
c  -3 does not represent an automaton state.
c    -( b^{1, 925}_2 ∧  b^{1, 925}_1 ∧  b^{1, 925}_0 ∧ true) 
c  in CNF:
c    -b^{1, 925}_2 ∨ -b^{1, 925}_1 ∨ -b^{1, 925}_0 ∨ false 
c  in DIMACS:
-3935 -3936 -3937  0

c i = 926
c  -2+1 --> -1
c    ( b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧  p_926) -> ( b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0)
c  in CNF:
c    -b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨  b^{1, 927}_2
c    -b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_1
c    -b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨  b^{1, 927}_0
c  in DIMACS:
-3938 -3939  3940 -926  3941 0
-3938 -3939  3940 -926 -3942 0
-3938 -3939  3940 -926  3943 0

c  -1+1 --> 0
c    ( b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0 ∧  p_926) -> (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧ -b^{1, 927}_0)
c  in CNF:
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_2
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_1
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_0
c  in DIMACS:
-3938  3939 -3940 -926 -3941 0
-3938  3939 -3940 -926 -3942 0
-3938  3939 -3940 -926 -3943 0

c  0+1 --> 1
c    (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧  p_926) -> (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0)
c  in CNF:
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_2
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_1
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨  b^{1, 927}_0
c  in DIMACS:
 3938  3939  3940 -926 -3941 0
 3938  3939  3940 -926 -3942 0
 3938  3939  3940 -926  3943 0

c  1+1 --> 2
c    (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0 ∧  p_926) -> (-b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0)
c  in CNF:
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_2
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨  b^{1, 927}_1
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ -p_926 ∨ -b^{1, 927}_0
c  in DIMACS:
 3938  3939 -3940 -926 -3941 0
 3938  3939 -3940 -926  3942 0
 3938  3939 -3940 -926 -3943 0

c  2+1 --> break 
c    (-b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧  p_926) -> break
c  in CNF:
c     b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ -p_926 ∨ break
c  in DIMACS:
 3938 -3939  3940 -926 1162 0


c  2-1 --> 1
c    (-b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧ -p_926) -> (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0)
c  in CNF:
c     b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_2
c     b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_1
c     b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨  b^{1, 927}_0
c  in DIMACS:
 3938 -3939  3940  926 -3941 0
 3938 -3939  3940  926 -3942 0
 3938 -3939  3940  926  3943 0

c  1-1 --> 0
c    (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0 ∧ -p_926) -> (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧ -b^{1, 927}_0)
c  in CNF:
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_2
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_1
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_0
c  in DIMACS:
 3938  3939 -3940  926 -3941 0
 3938  3939 -3940  926 -3942 0
 3938  3939 -3940  926 -3943 0

c  0-1 --> -1
c    (-b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧ -p_926) -> ( b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0)
c  in CNF:
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨  b^{1, 927}_2
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_1
c     b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨  b^{1, 927}_0
c  in DIMACS:
 3938  3939  3940  926  3941 0
 3938  3939  3940  926 -3942 0
 3938  3939  3940  926  3943 0

c  -1-1 --> -2
c    ( b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧  b^{1, 926}_0 ∧ -p_926) -> ( b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0)
c  in CNF:
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨  b^{1, 927}_2
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨  b^{1, 927}_1
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨  p_926 ∨ -b^{1, 927}_0
c  in DIMACS:
-3938  3939 -3940  926  3941 0
-3938  3939 -3940  926  3942 0
-3938  3939 -3940  926 -3943 0

c  -2-1 --> break 
c    ( b^{1, 926}_2 ∧  b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧ -p_926) -> break
c  in CNF:
c    -b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨  b^{1, 926}_0 ∨  p_926 ∨ break
c  in DIMACS:
-3938 -3939  3940  926 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 926}_2 ∧ -b^{1, 926}_1 ∧ -b^{1, 926}_0 ∧ true) 
c  in CNF:
c    -b^{1, 926}_2 ∨  b^{1, 926}_1 ∨  b^{1, 926}_0 ∨ false 
c  in DIMACS:
-3938  3939  3940  0

c  3 does not represent an automaton state.
c    -(-b^{1, 926}_2 ∧  b^{1, 926}_1 ∧  b^{1, 926}_0 ∧ true) 
c  in CNF:
c     b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ false 
c  in DIMACS:
 3938 -3939 -3940  0
c  -3 does not represent an automaton state.
c    -( b^{1, 926}_2 ∧  b^{1, 926}_1 ∧  b^{1, 926}_0 ∧ true) 
c  in CNF:
c    -b^{1, 926}_2 ∨ -b^{1, 926}_1 ∨ -b^{1, 926}_0 ∨ false 
c  in DIMACS:
-3938 -3939 -3940  0

c i = 927
c  -2+1 --> -1
c    ( b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧  p_927) -> ( b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0)
c  in CNF:
c    -b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨  b^{1, 928}_2
c    -b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_1
c    -b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨  b^{1, 928}_0
c  in DIMACS:
-3941 -3942  3943 -927  3944 0
-3941 -3942  3943 -927 -3945 0
-3941 -3942  3943 -927  3946 0

c  -1+1 --> 0
c    ( b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0 ∧  p_927) -> (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧ -b^{1, 928}_0)
c  in CNF:
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_2
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_1
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_0
c  in DIMACS:
-3941  3942 -3943 -927 -3944 0
-3941  3942 -3943 -927 -3945 0
-3941  3942 -3943 -927 -3946 0

c  0+1 --> 1
c    (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧  p_927) -> (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0)
c  in CNF:
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_2
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_1
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨  b^{1, 928}_0
c  in DIMACS:
 3941  3942  3943 -927 -3944 0
 3941  3942  3943 -927 -3945 0
 3941  3942  3943 -927  3946 0

c  1+1 --> 2
c    (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0 ∧  p_927) -> (-b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0)
c  in CNF:
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_2
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨  b^{1, 928}_1
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ -p_927 ∨ -b^{1, 928}_0
c  in DIMACS:
 3941  3942 -3943 -927 -3944 0
 3941  3942 -3943 -927  3945 0
 3941  3942 -3943 -927 -3946 0

c  2+1 --> break 
c    (-b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧  p_927) -> break
c  in CNF:
c     b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ -p_927 ∨ break
c  in DIMACS:
 3941 -3942  3943 -927 1162 0


c  2-1 --> 1
c    (-b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧ -p_927) -> (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0)
c  in CNF:
c     b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_2
c     b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_1
c     b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨  b^{1, 928}_0
c  in DIMACS:
 3941 -3942  3943  927 -3944 0
 3941 -3942  3943  927 -3945 0
 3941 -3942  3943  927  3946 0

c  1-1 --> 0
c    (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0 ∧ -p_927) -> (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧ -b^{1, 928}_0)
c  in CNF:
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_2
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_1
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_0
c  in DIMACS:
 3941  3942 -3943  927 -3944 0
 3941  3942 -3943  927 -3945 0
 3941  3942 -3943  927 -3946 0

c  0-1 --> -1
c    (-b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧ -p_927) -> ( b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0)
c  in CNF:
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨  b^{1, 928}_2
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_1
c     b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨  b^{1, 928}_0
c  in DIMACS:
 3941  3942  3943  927  3944 0
 3941  3942  3943  927 -3945 0
 3941  3942  3943  927  3946 0

c  -1-1 --> -2
c    ( b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧  b^{1, 927}_0 ∧ -p_927) -> ( b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0)
c  in CNF:
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨  b^{1, 928}_2
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨  b^{1, 928}_1
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨  p_927 ∨ -b^{1, 928}_0
c  in DIMACS:
-3941  3942 -3943  927  3944 0
-3941  3942 -3943  927  3945 0
-3941  3942 -3943  927 -3946 0

c  -2-1 --> break 
c    ( b^{1, 927}_2 ∧  b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧ -p_927) -> break
c  in CNF:
c    -b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨  b^{1, 927}_0 ∨  p_927 ∨ break
c  in DIMACS:
-3941 -3942  3943  927 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 927}_2 ∧ -b^{1, 927}_1 ∧ -b^{1, 927}_0 ∧ true) 
c  in CNF:
c    -b^{1, 927}_2 ∨  b^{1, 927}_1 ∨  b^{1, 927}_0 ∨ false 
c  in DIMACS:
-3941  3942  3943  0

c  3 does not represent an automaton state.
c    -(-b^{1, 927}_2 ∧  b^{1, 927}_1 ∧  b^{1, 927}_0 ∧ true) 
c  in CNF:
c     b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ false 
c  in DIMACS:
 3941 -3942 -3943  0
c  -3 does not represent an automaton state.
c    -( b^{1, 927}_2 ∧  b^{1, 927}_1 ∧  b^{1, 927}_0 ∧ true) 
c  in CNF:
c    -b^{1, 927}_2 ∨ -b^{1, 927}_1 ∨ -b^{1, 927}_0 ∨ false 
c  in DIMACS:
-3941 -3942 -3943  0

c i = 928
c  -2+1 --> -1
c    ( b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧  p_928) -> ( b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0)
c  in CNF:
c    -b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨  b^{1, 929}_2
c    -b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_1
c    -b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨  b^{1, 929}_0
c  in DIMACS:
-3944 -3945  3946 -928  3947 0
-3944 -3945  3946 -928 -3948 0
-3944 -3945  3946 -928  3949 0

c  -1+1 --> 0
c    ( b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0 ∧  p_928) -> (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧ -b^{1, 929}_0)
c  in CNF:
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_2
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_1
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_0
c  in DIMACS:
-3944  3945 -3946 -928 -3947 0
-3944  3945 -3946 -928 -3948 0
-3944  3945 -3946 -928 -3949 0

c  0+1 --> 1
c    (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧  p_928) -> (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0)
c  in CNF:
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_2
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_1
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨  b^{1, 929}_0
c  in DIMACS:
 3944  3945  3946 -928 -3947 0
 3944  3945  3946 -928 -3948 0
 3944  3945  3946 -928  3949 0

c  1+1 --> 2
c    (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0 ∧  p_928) -> (-b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0)
c  in CNF:
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_2
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨  b^{1, 929}_1
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ -p_928 ∨ -b^{1, 929}_0
c  in DIMACS:
 3944  3945 -3946 -928 -3947 0
 3944  3945 -3946 -928  3948 0
 3944  3945 -3946 -928 -3949 0

c  2+1 --> break 
c    (-b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧  p_928) -> break
c  in CNF:
c     b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 3944 -3945  3946 -928 1162 0


c  2-1 --> 1
c    (-b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧ -p_928) -> (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0)
c  in CNF:
c     b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_2
c     b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_1
c     b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨  b^{1, 929}_0
c  in DIMACS:
 3944 -3945  3946  928 -3947 0
 3944 -3945  3946  928 -3948 0
 3944 -3945  3946  928  3949 0

c  1-1 --> 0
c    (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0 ∧ -p_928) -> (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧ -b^{1, 929}_0)
c  in CNF:
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_2
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_1
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_0
c  in DIMACS:
 3944  3945 -3946  928 -3947 0
 3944  3945 -3946  928 -3948 0
 3944  3945 -3946  928 -3949 0

c  0-1 --> -1
c    (-b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧ -p_928) -> ( b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0)
c  in CNF:
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨  b^{1, 929}_2
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_1
c     b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨  b^{1, 929}_0
c  in DIMACS:
 3944  3945  3946  928  3947 0
 3944  3945  3946  928 -3948 0
 3944  3945  3946  928  3949 0

c  -1-1 --> -2
c    ( b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧  b^{1, 928}_0 ∧ -p_928) -> ( b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0)
c  in CNF:
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨  b^{1, 929}_2
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨  b^{1, 929}_1
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨  p_928 ∨ -b^{1, 929}_0
c  in DIMACS:
-3944  3945 -3946  928  3947 0
-3944  3945 -3946  928  3948 0
-3944  3945 -3946  928 -3949 0

c  -2-1 --> break 
c    ( b^{1, 928}_2 ∧  b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨  b^{1, 928}_0 ∨  p_928 ∨ break
c  in DIMACS:
-3944 -3945  3946  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 928}_2 ∧ -b^{1, 928}_1 ∧ -b^{1, 928}_0 ∧ true) 
c  in CNF:
c    -b^{1, 928}_2 ∨  b^{1, 928}_1 ∨  b^{1, 928}_0 ∨ false 
c  in DIMACS:
-3944  3945  3946  0

c  3 does not represent an automaton state.
c    -(-b^{1, 928}_2 ∧  b^{1, 928}_1 ∧  b^{1, 928}_0 ∧ true) 
c  in CNF:
c     b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ false 
c  in DIMACS:
 3944 -3945 -3946  0
c  -3 does not represent an automaton state.
c    -( b^{1, 928}_2 ∧  b^{1, 928}_1 ∧  b^{1, 928}_0 ∧ true) 
c  in CNF:
c    -b^{1, 928}_2 ∨ -b^{1, 928}_1 ∨ -b^{1, 928}_0 ∨ false 
c  in DIMACS:
-3944 -3945 -3946  0

c i = 929
c  -2+1 --> -1
c    ( b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧  p_929) -> ( b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0)
c  in CNF:
c    -b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨  b^{1, 930}_2
c    -b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_1
c    -b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨  b^{1, 930}_0
c  in DIMACS:
-3947 -3948  3949 -929  3950 0
-3947 -3948  3949 -929 -3951 0
-3947 -3948  3949 -929  3952 0

c  -1+1 --> 0
c    ( b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0 ∧  p_929) -> (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧ -b^{1, 930}_0)
c  in CNF:
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_2
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_1
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_0
c  in DIMACS:
-3947  3948 -3949 -929 -3950 0
-3947  3948 -3949 -929 -3951 0
-3947  3948 -3949 -929 -3952 0

c  0+1 --> 1
c    (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧  p_929) -> (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0)
c  in CNF:
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_2
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_1
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨  b^{1, 930}_0
c  in DIMACS:
 3947  3948  3949 -929 -3950 0
 3947  3948  3949 -929 -3951 0
 3947  3948  3949 -929  3952 0

c  1+1 --> 2
c    (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0 ∧  p_929) -> (-b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0)
c  in CNF:
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_2
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨  b^{1, 930}_1
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ -p_929 ∨ -b^{1, 930}_0
c  in DIMACS:
 3947  3948 -3949 -929 -3950 0
 3947  3948 -3949 -929  3951 0
 3947  3948 -3949 -929 -3952 0

c  2+1 --> break 
c    (-b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧  p_929) -> break
c  in CNF:
c     b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ -p_929 ∨ break
c  in DIMACS:
 3947 -3948  3949 -929 1162 0


c  2-1 --> 1
c    (-b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧ -p_929) -> (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0)
c  in CNF:
c     b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_2
c     b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_1
c     b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨  b^{1, 930}_0
c  in DIMACS:
 3947 -3948  3949  929 -3950 0
 3947 -3948  3949  929 -3951 0
 3947 -3948  3949  929  3952 0

c  1-1 --> 0
c    (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0 ∧ -p_929) -> (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧ -b^{1, 930}_0)
c  in CNF:
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_2
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_1
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_0
c  in DIMACS:
 3947  3948 -3949  929 -3950 0
 3947  3948 -3949  929 -3951 0
 3947  3948 -3949  929 -3952 0

c  0-1 --> -1
c    (-b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧ -p_929) -> ( b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0)
c  in CNF:
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨  b^{1, 930}_2
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_1
c     b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨  b^{1, 930}_0
c  in DIMACS:
 3947  3948  3949  929  3950 0
 3947  3948  3949  929 -3951 0
 3947  3948  3949  929  3952 0

c  -1-1 --> -2
c    ( b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧  b^{1, 929}_0 ∧ -p_929) -> ( b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0)
c  in CNF:
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨  b^{1, 930}_2
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨  b^{1, 930}_1
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨  p_929 ∨ -b^{1, 930}_0
c  in DIMACS:
-3947  3948 -3949  929  3950 0
-3947  3948 -3949  929  3951 0
-3947  3948 -3949  929 -3952 0

c  -2-1 --> break 
c    ( b^{1, 929}_2 ∧  b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧ -p_929) -> break
c  in CNF:
c    -b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨  b^{1, 929}_0 ∨  p_929 ∨ break
c  in DIMACS:
-3947 -3948  3949  929 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 929}_2 ∧ -b^{1, 929}_1 ∧ -b^{1, 929}_0 ∧ true) 
c  in CNF:
c    -b^{1, 929}_2 ∨  b^{1, 929}_1 ∨  b^{1, 929}_0 ∨ false 
c  in DIMACS:
-3947  3948  3949  0

c  3 does not represent an automaton state.
c    -(-b^{1, 929}_2 ∧  b^{1, 929}_1 ∧  b^{1, 929}_0 ∧ true) 
c  in CNF:
c     b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ false 
c  in DIMACS:
 3947 -3948 -3949  0
c  -3 does not represent an automaton state.
c    -( b^{1, 929}_2 ∧  b^{1, 929}_1 ∧  b^{1, 929}_0 ∧ true) 
c  in CNF:
c    -b^{1, 929}_2 ∨ -b^{1, 929}_1 ∨ -b^{1, 929}_0 ∨ false 
c  in DIMACS:
-3947 -3948 -3949  0

c i = 930
c  -2+1 --> -1
c    ( b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧  p_930) -> ( b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0)
c  in CNF:
c    -b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨  b^{1, 931}_2
c    -b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_1
c    -b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨  b^{1, 931}_0
c  in DIMACS:
-3950 -3951  3952 -930  3953 0
-3950 -3951  3952 -930 -3954 0
-3950 -3951  3952 -930  3955 0

c  -1+1 --> 0
c    ( b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0 ∧  p_930) -> (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧ -b^{1, 931}_0)
c  in CNF:
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_2
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_1
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_0
c  in DIMACS:
-3950  3951 -3952 -930 -3953 0
-3950  3951 -3952 -930 -3954 0
-3950  3951 -3952 -930 -3955 0

c  0+1 --> 1
c    (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧  p_930) -> (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0)
c  in CNF:
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_2
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_1
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨  b^{1, 931}_0
c  in DIMACS:
 3950  3951  3952 -930 -3953 0
 3950  3951  3952 -930 -3954 0
 3950  3951  3952 -930  3955 0

c  1+1 --> 2
c    (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0 ∧  p_930) -> (-b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0)
c  in CNF:
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_2
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨  b^{1, 931}_1
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ -p_930 ∨ -b^{1, 931}_0
c  in DIMACS:
 3950  3951 -3952 -930 -3953 0
 3950  3951 -3952 -930  3954 0
 3950  3951 -3952 -930 -3955 0

c  2+1 --> break 
c    (-b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧  p_930) -> break
c  in CNF:
c     b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 3950 -3951  3952 -930 1162 0


c  2-1 --> 1
c    (-b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧ -p_930) -> (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0)
c  in CNF:
c     b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_2
c     b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_1
c     b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨  b^{1, 931}_0
c  in DIMACS:
 3950 -3951  3952  930 -3953 0
 3950 -3951  3952  930 -3954 0
 3950 -3951  3952  930  3955 0

c  1-1 --> 0
c    (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0 ∧ -p_930) -> (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧ -b^{1, 931}_0)
c  in CNF:
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_2
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_1
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_0
c  in DIMACS:
 3950  3951 -3952  930 -3953 0
 3950  3951 -3952  930 -3954 0
 3950  3951 -3952  930 -3955 0

c  0-1 --> -1
c    (-b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧ -p_930) -> ( b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0)
c  in CNF:
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨  b^{1, 931}_2
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_1
c     b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨  b^{1, 931}_0
c  in DIMACS:
 3950  3951  3952  930  3953 0
 3950  3951  3952  930 -3954 0
 3950  3951  3952  930  3955 0

c  -1-1 --> -2
c    ( b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧  b^{1, 930}_0 ∧ -p_930) -> ( b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0)
c  in CNF:
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨  b^{1, 931}_2
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨  b^{1, 931}_1
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨  p_930 ∨ -b^{1, 931}_0
c  in DIMACS:
-3950  3951 -3952  930  3953 0
-3950  3951 -3952  930  3954 0
-3950  3951 -3952  930 -3955 0

c  -2-1 --> break 
c    ( b^{1, 930}_2 ∧  b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨  b^{1, 930}_0 ∨  p_930 ∨ break
c  in DIMACS:
-3950 -3951  3952  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 930}_2 ∧ -b^{1, 930}_1 ∧ -b^{1, 930}_0 ∧ true) 
c  in CNF:
c    -b^{1, 930}_2 ∨  b^{1, 930}_1 ∨  b^{1, 930}_0 ∨ false 
c  in DIMACS:
-3950  3951  3952  0

c  3 does not represent an automaton state.
c    -(-b^{1, 930}_2 ∧  b^{1, 930}_1 ∧  b^{1, 930}_0 ∧ true) 
c  in CNF:
c     b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ false 
c  in DIMACS:
 3950 -3951 -3952  0
c  -3 does not represent an automaton state.
c    -( b^{1, 930}_2 ∧  b^{1, 930}_1 ∧  b^{1, 930}_0 ∧ true) 
c  in CNF:
c    -b^{1, 930}_2 ∨ -b^{1, 930}_1 ∨ -b^{1, 930}_0 ∨ false 
c  in DIMACS:
-3950 -3951 -3952  0

c i = 931
c  -2+1 --> -1
c    ( b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧  p_931) -> ( b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0)
c  in CNF:
c    -b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨  b^{1, 932}_2
c    -b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_1
c    -b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨  b^{1, 932}_0
c  in DIMACS:
-3953 -3954  3955 -931  3956 0
-3953 -3954  3955 -931 -3957 0
-3953 -3954  3955 -931  3958 0

c  -1+1 --> 0
c    ( b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0 ∧  p_931) -> (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧ -b^{1, 932}_0)
c  in CNF:
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_2
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_1
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_0
c  in DIMACS:
-3953  3954 -3955 -931 -3956 0
-3953  3954 -3955 -931 -3957 0
-3953  3954 -3955 -931 -3958 0

c  0+1 --> 1
c    (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧  p_931) -> (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0)
c  in CNF:
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_2
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_1
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨  b^{1, 932}_0
c  in DIMACS:
 3953  3954  3955 -931 -3956 0
 3953  3954  3955 -931 -3957 0
 3953  3954  3955 -931  3958 0

c  1+1 --> 2
c    (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0 ∧  p_931) -> (-b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0)
c  in CNF:
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_2
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨  b^{1, 932}_1
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ -p_931 ∨ -b^{1, 932}_0
c  in DIMACS:
 3953  3954 -3955 -931 -3956 0
 3953  3954 -3955 -931  3957 0
 3953  3954 -3955 -931 -3958 0

c  2+1 --> break 
c    (-b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧  p_931) -> break
c  in CNF:
c     b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ -p_931 ∨ break
c  in DIMACS:
 3953 -3954  3955 -931 1162 0


c  2-1 --> 1
c    (-b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧ -p_931) -> (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0)
c  in CNF:
c     b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_2
c     b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_1
c     b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨  b^{1, 932}_0
c  in DIMACS:
 3953 -3954  3955  931 -3956 0
 3953 -3954  3955  931 -3957 0
 3953 -3954  3955  931  3958 0

c  1-1 --> 0
c    (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0 ∧ -p_931) -> (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧ -b^{1, 932}_0)
c  in CNF:
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_2
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_1
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_0
c  in DIMACS:
 3953  3954 -3955  931 -3956 0
 3953  3954 -3955  931 -3957 0
 3953  3954 -3955  931 -3958 0

c  0-1 --> -1
c    (-b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧ -p_931) -> ( b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0)
c  in CNF:
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨  b^{1, 932}_2
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_1
c     b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨  b^{1, 932}_0
c  in DIMACS:
 3953  3954  3955  931  3956 0
 3953  3954  3955  931 -3957 0
 3953  3954  3955  931  3958 0

c  -1-1 --> -2
c    ( b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧  b^{1, 931}_0 ∧ -p_931) -> ( b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0)
c  in CNF:
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨  b^{1, 932}_2
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨  b^{1, 932}_1
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨  p_931 ∨ -b^{1, 932}_0
c  in DIMACS:
-3953  3954 -3955  931  3956 0
-3953  3954 -3955  931  3957 0
-3953  3954 -3955  931 -3958 0

c  -2-1 --> break 
c    ( b^{1, 931}_2 ∧  b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧ -p_931) -> break
c  in CNF:
c    -b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨  b^{1, 931}_0 ∨  p_931 ∨ break
c  in DIMACS:
-3953 -3954  3955  931 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 931}_2 ∧ -b^{1, 931}_1 ∧ -b^{1, 931}_0 ∧ true) 
c  in CNF:
c    -b^{1, 931}_2 ∨  b^{1, 931}_1 ∨  b^{1, 931}_0 ∨ false 
c  in DIMACS:
-3953  3954  3955  0

c  3 does not represent an automaton state.
c    -(-b^{1, 931}_2 ∧  b^{1, 931}_1 ∧  b^{1, 931}_0 ∧ true) 
c  in CNF:
c     b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ false 
c  in DIMACS:
 3953 -3954 -3955  0
c  -3 does not represent an automaton state.
c    -( b^{1, 931}_2 ∧  b^{1, 931}_1 ∧  b^{1, 931}_0 ∧ true) 
c  in CNF:
c    -b^{1, 931}_2 ∨ -b^{1, 931}_1 ∨ -b^{1, 931}_0 ∨ false 
c  in DIMACS:
-3953 -3954 -3955  0

c i = 932
c  -2+1 --> -1
c    ( b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧  p_932) -> ( b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0)
c  in CNF:
c    -b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨  b^{1, 933}_2
c    -b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_1
c    -b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨  b^{1, 933}_0
c  in DIMACS:
-3956 -3957  3958 -932  3959 0
-3956 -3957  3958 -932 -3960 0
-3956 -3957  3958 -932  3961 0

c  -1+1 --> 0
c    ( b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0 ∧  p_932) -> (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧ -b^{1, 933}_0)
c  in CNF:
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_2
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_1
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_0
c  in DIMACS:
-3956  3957 -3958 -932 -3959 0
-3956  3957 -3958 -932 -3960 0
-3956  3957 -3958 -932 -3961 0

c  0+1 --> 1
c    (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧  p_932) -> (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0)
c  in CNF:
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_2
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_1
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨  b^{1, 933}_0
c  in DIMACS:
 3956  3957  3958 -932 -3959 0
 3956  3957  3958 -932 -3960 0
 3956  3957  3958 -932  3961 0

c  1+1 --> 2
c    (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0 ∧  p_932) -> (-b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0)
c  in CNF:
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_2
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨  b^{1, 933}_1
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ -p_932 ∨ -b^{1, 933}_0
c  in DIMACS:
 3956  3957 -3958 -932 -3959 0
 3956  3957 -3958 -932  3960 0
 3956  3957 -3958 -932 -3961 0

c  2+1 --> break 
c    (-b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧  p_932) -> break
c  in CNF:
c     b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ -p_932 ∨ break
c  in DIMACS:
 3956 -3957  3958 -932 1162 0


c  2-1 --> 1
c    (-b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧ -p_932) -> (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0)
c  in CNF:
c     b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_2
c     b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_1
c     b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨  b^{1, 933}_0
c  in DIMACS:
 3956 -3957  3958  932 -3959 0
 3956 -3957  3958  932 -3960 0
 3956 -3957  3958  932  3961 0

c  1-1 --> 0
c    (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0 ∧ -p_932) -> (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧ -b^{1, 933}_0)
c  in CNF:
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_2
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_1
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_0
c  in DIMACS:
 3956  3957 -3958  932 -3959 0
 3956  3957 -3958  932 -3960 0
 3956  3957 -3958  932 -3961 0

c  0-1 --> -1
c    (-b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧ -p_932) -> ( b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0)
c  in CNF:
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨  b^{1, 933}_2
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_1
c     b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨  b^{1, 933}_0
c  in DIMACS:
 3956  3957  3958  932  3959 0
 3956  3957  3958  932 -3960 0
 3956  3957  3958  932  3961 0

c  -1-1 --> -2
c    ( b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧  b^{1, 932}_0 ∧ -p_932) -> ( b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0)
c  in CNF:
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨  b^{1, 933}_2
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨  b^{1, 933}_1
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨  p_932 ∨ -b^{1, 933}_0
c  in DIMACS:
-3956  3957 -3958  932  3959 0
-3956  3957 -3958  932  3960 0
-3956  3957 -3958  932 -3961 0

c  -2-1 --> break 
c    ( b^{1, 932}_2 ∧  b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧ -p_932) -> break
c  in CNF:
c    -b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨  b^{1, 932}_0 ∨  p_932 ∨ break
c  in DIMACS:
-3956 -3957  3958  932 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 932}_2 ∧ -b^{1, 932}_1 ∧ -b^{1, 932}_0 ∧ true) 
c  in CNF:
c    -b^{1, 932}_2 ∨  b^{1, 932}_1 ∨  b^{1, 932}_0 ∨ false 
c  in DIMACS:
-3956  3957  3958  0

c  3 does not represent an automaton state.
c    -(-b^{1, 932}_2 ∧  b^{1, 932}_1 ∧  b^{1, 932}_0 ∧ true) 
c  in CNF:
c     b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ false 
c  in DIMACS:
 3956 -3957 -3958  0
c  -3 does not represent an automaton state.
c    -( b^{1, 932}_2 ∧  b^{1, 932}_1 ∧  b^{1, 932}_0 ∧ true) 
c  in CNF:
c    -b^{1, 932}_2 ∨ -b^{1, 932}_1 ∨ -b^{1, 932}_0 ∨ false 
c  in DIMACS:
-3956 -3957 -3958  0

c i = 933
c  -2+1 --> -1
c    ( b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧  p_933) -> ( b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0)
c  in CNF:
c    -b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨  b^{1, 934}_2
c    -b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_1
c    -b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨  b^{1, 934}_0
c  in DIMACS:
-3959 -3960  3961 -933  3962 0
-3959 -3960  3961 -933 -3963 0
-3959 -3960  3961 -933  3964 0

c  -1+1 --> 0
c    ( b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0 ∧  p_933) -> (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧ -b^{1, 934}_0)
c  in CNF:
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_2
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_1
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_0
c  in DIMACS:
-3959  3960 -3961 -933 -3962 0
-3959  3960 -3961 -933 -3963 0
-3959  3960 -3961 -933 -3964 0

c  0+1 --> 1
c    (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧  p_933) -> (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0)
c  in CNF:
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_2
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_1
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨  b^{1, 934}_0
c  in DIMACS:
 3959  3960  3961 -933 -3962 0
 3959  3960  3961 -933 -3963 0
 3959  3960  3961 -933  3964 0

c  1+1 --> 2
c    (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0 ∧  p_933) -> (-b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0)
c  in CNF:
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_2
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨  b^{1, 934}_1
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ -p_933 ∨ -b^{1, 934}_0
c  in DIMACS:
 3959  3960 -3961 -933 -3962 0
 3959  3960 -3961 -933  3963 0
 3959  3960 -3961 -933 -3964 0

c  2+1 --> break 
c    (-b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧  p_933) -> break
c  in CNF:
c     b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ -p_933 ∨ break
c  in DIMACS:
 3959 -3960  3961 -933 1162 0


c  2-1 --> 1
c    (-b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧ -p_933) -> (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0)
c  in CNF:
c     b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_2
c     b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_1
c     b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨  b^{1, 934}_0
c  in DIMACS:
 3959 -3960  3961  933 -3962 0
 3959 -3960  3961  933 -3963 0
 3959 -3960  3961  933  3964 0

c  1-1 --> 0
c    (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0 ∧ -p_933) -> (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧ -b^{1, 934}_0)
c  in CNF:
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_2
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_1
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_0
c  in DIMACS:
 3959  3960 -3961  933 -3962 0
 3959  3960 -3961  933 -3963 0
 3959  3960 -3961  933 -3964 0

c  0-1 --> -1
c    (-b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧ -p_933) -> ( b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0)
c  in CNF:
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨  b^{1, 934}_2
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_1
c     b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨  b^{1, 934}_0
c  in DIMACS:
 3959  3960  3961  933  3962 0
 3959  3960  3961  933 -3963 0
 3959  3960  3961  933  3964 0

c  -1-1 --> -2
c    ( b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧  b^{1, 933}_0 ∧ -p_933) -> ( b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0)
c  in CNF:
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨  b^{1, 934}_2
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨  b^{1, 934}_1
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨  p_933 ∨ -b^{1, 934}_0
c  in DIMACS:
-3959  3960 -3961  933  3962 0
-3959  3960 -3961  933  3963 0
-3959  3960 -3961  933 -3964 0

c  -2-1 --> break 
c    ( b^{1, 933}_2 ∧  b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧ -p_933) -> break
c  in CNF:
c    -b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨  b^{1, 933}_0 ∨  p_933 ∨ break
c  in DIMACS:
-3959 -3960  3961  933 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 933}_2 ∧ -b^{1, 933}_1 ∧ -b^{1, 933}_0 ∧ true) 
c  in CNF:
c    -b^{1, 933}_2 ∨  b^{1, 933}_1 ∨  b^{1, 933}_0 ∨ false 
c  in DIMACS:
-3959  3960  3961  0

c  3 does not represent an automaton state.
c    -(-b^{1, 933}_2 ∧  b^{1, 933}_1 ∧  b^{1, 933}_0 ∧ true) 
c  in CNF:
c     b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ false 
c  in DIMACS:
 3959 -3960 -3961  0
c  -3 does not represent an automaton state.
c    -( b^{1, 933}_2 ∧  b^{1, 933}_1 ∧  b^{1, 933}_0 ∧ true) 
c  in CNF:
c    -b^{1, 933}_2 ∨ -b^{1, 933}_1 ∨ -b^{1, 933}_0 ∨ false 
c  in DIMACS:
-3959 -3960 -3961  0

c i = 934
c  -2+1 --> -1
c    ( b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧  p_934) -> ( b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0)
c  in CNF:
c    -b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨  b^{1, 935}_2
c    -b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_1
c    -b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨  b^{1, 935}_0
c  in DIMACS:
-3962 -3963  3964 -934  3965 0
-3962 -3963  3964 -934 -3966 0
-3962 -3963  3964 -934  3967 0

c  -1+1 --> 0
c    ( b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0 ∧  p_934) -> (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧ -b^{1, 935}_0)
c  in CNF:
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_2
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_1
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_0
c  in DIMACS:
-3962  3963 -3964 -934 -3965 0
-3962  3963 -3964 -934 -3966 0
-3962  3963 -3964 -934 -3967 0

c  0+1 --> 1
c    (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧  p_934) -> (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0)
c  in CNF:
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_2
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_1
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨  b^{1, 935}_0
c  in DIMACS:
 3962  3963  3964 -934 -3965 0
 3962  3963  3964 -934 -3966 0
 3962  3963  3964 -934  3967 0

c  1+1 --> 2
c    (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0 ∧  p_934) -> (-b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0)
c  in CNF:
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_2
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨  b^{1, 935}_1
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ -p_934 ∨ -b^{1, 935}_0
c  in DIMACS:
 3962  3963 -3964 -934 -3965 0
 3962  3963 -3964 -934  3966 0
 3962  3963 -3964 -934 -3967 0

c  2+1 --> break 
c    (-b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧  p_934) -> break
c  in CNF:
c     b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ -p_934 ∨ break
c  in DIMACS:
 3962 -3963  3964 -934 1162 0


c  2-1 --> 1
c    (-b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧ -p_934) -> (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0)
c  in CNF:
c     b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_2
c     b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_1
c     b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨  b^{1, 935}_0
c  in DIMACS:
 3962 -3963  3964  934 -3965 0
 3962 -3963  3964  934 -3966 0
 3962 -3963  3964  934  3967 0

c  1-1 --> 0
c    (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0 ∧ -p_934) -> (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧ -b^{1, 935}_0)
c  in CNF:
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_2
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_1
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_0
c  in DIMACS:
 3962  3963 -3964  934 -3965 0
 3962  3963 -3964  934 -3966 0
 3962  3963 -3964  934 -3967 0

c  0-1 --> -1
c    (-b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧ -p_934) -> ( b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0)
c  in CNF:
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨  b^{1, 935}_2
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_1
c     b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨  b^{1, 935}_0
c  in DIMACS:
 3962  3963  3964  934  3965 0
 3962  3963  3964  934 -3966 0
 3962  3963  3964  934  3967 0

c  -1-1 --> -2
c    ( b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧  b^{1, 934}_0 ∧ -p_934) -> ( b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0)
c  in CNF:
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨  b^{1, 935}_2
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨  b^{1, 935}_1
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨  p_934 ∨ -b^{1, 935}_0
c  in DIMACS:
-3962  3963 -3964  934  3965 0
-3962  3963 -3964  934  3966 0
-3962  3963 -3964  934 -3967 0

c  -2-1 --> break 
c    ( b^{1, 934}_2 ∧  b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧ -p_934) -> break
c  in CNF:
c    -b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨  b^{1, 934}_0 ∨  p_934 ∨ break
c  in DIMACS:
-3962 -3963  3964  934 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 934}_2 ∧ -b^{1, 934}_1 ∧ -b^{1, 934}_0 ∧ true) 
c  in CNF:
c    -b^{1, 934}_2 ∨  b^{1, 934}_1 ∨  b^{1, 934}_0 ∨ false 
c  in DIMACS:
-3962  3963  3964  0

c  3 does not represent an automaton state.
c    -(-b^{1, 934}_2 ∧  b^{1, 934}_1 ∧  b^{1, 934}_0 ∧ true) 
c  in CNF:
c     b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ false 
c  in DIMACS:
 3962 -3963 -3964  0
c  -3 does not represent an automaton state.
c    -( b^{1, 934}_2 ∧  b^{1, 934}_1 ∧  b^{1, 934}_0 ∧ true) 
c  in CNF:
c    -b^{1, 934}_2 ∨ -b^{1, 934}_1 ∨ -b^{1, 934}_0 ∨ false 
c  in DIMACS:
-3962 -3963 -3964  0

c i = 935
c  -2+1 --> -1
c    ( b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧  p_935) -> ( b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0)
c  in CNF:
c    -b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨  b^{1, 936}_2
c    -b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_1
c    -b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨  b^{1, 936}_0
c  in DIMACS:
-3965 -3966  3967 -935  3968 0
-3965 -3966  3967 -935 -3969 0
-3965 -3966  3967 -935  3970 0

c  -1+1 --> 0
c    ( b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0 ∧  p_935) -> (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧ -b^{1, 936}_0)
c  in CNF:
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_2
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_1
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_0
c  in DIMACS:
-3965  3966 -3967 -935 -3968 0
-3965  3966 -3967 -935 -3969 0
-3965  3966 -3967 -935 -3970 0

c  0+1 --> 1
c    (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧  p_935) -> (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0)
c  in CNF:
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_2
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_1
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨  b^{1, 936}_0
c  in DIMACS:
 3965  3966  3967 -935 -3968 0
 3965  3966  3967 -935 -3969 0
 3965  3966  3967 -935  3970 0

c  1+1 --> 2
c    (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0 ∧  p_935) -> (-b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0)
c  in CNF:
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_2
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨  b^{1, 936}_1
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ -p_935 ∨ -b^{1, 936}_0
c  in DIMACS:
 3965  3966 -3967 -935 -3968 0
 3965  3966 -3967 -935  3969 0
 3965  3966 -3967 -935 -3970 0

c  2+1 --> break 
c    (-b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧  p_935) -> break
c  in CNF:
c     b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 3965 -3966  3967 -935 1162 0


c  2-1 --> 1
c    (-b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧ -p_935) -> (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0)
c  in CNF:
c     b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_2
c     b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_1
c     b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨  b^{1, 936}_0
c  in DIMACS:
 3965 -3966  3967  935 -3968 0
 3965 -3966  3967  935 -3969 0
 3965 -3966  3967  935  3970 0

c  1-1 --> 0
c    (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0 ∧ -p_935) -> (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧ -b^{1, 936}_0)
c  in CNF:
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_2
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_1
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_0
c  in DIMACS:
 3965  3966 -3967  935 -3968 0
 3965  3966 -3967  935 -3969 0
 3965  3966 -3967  935 -3970 0

c  0-1 --> -1
c    (-b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧ -p_935) -> ( b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0)
c  in CNF:
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨  b^{1, 936}_2
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_1
c     b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨  b^{1, 936}_0
c  in DIMACS:
 3965  3966  3967  935  3968 0
 3965  3966  3967  935 -3969 0
 3965  3966  3967  935  3970 0

c  -1-1 --> -2
c    ( b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧  b^{1, 935}_0 ∧ -p_935) -> ( b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0)
c  in CNF:
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨  b^{1, 936}_2
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨  b^{1, 936}_1
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨  p_935 ∨ -b^{1, 936}_0
c  in DIMACS:
-3965  3966 -3967  935  3968 0
-3965  3966 -3967  935  3969 0
-3965  3966 -3967  935 -3970 0

c  -2-1 --> break 
c    ( b^{1, 935}_2 ∧  b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨  b^{1, 935}_0 ∨  p_935 ∨ break
c  in DIMACS:
-3965 -3966  3967  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 935}_2 ∧ -b^{1, 935}_1 ∧ -b^{1, 935}_0 ∧ true) 
c  in CNF:
c    -b^{1, 935}_2 ∨  b^{1, 935}_1 ∨  b^{1, 935}_0 ∨ false 
c  in DIMACS:
-3965  3966  3967  0

c  3 does not represent an automaton state.
c    -(-b^{1, 935}_2 ∧  b^{1, 935}_1 ∧  b^{1, 935}_0 ∧ true) 
c  in CNF:
c     b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ false 
c  in DIMACS:
 3965 -3966 -3967  0
c  -3 does not represent an automaton state.
c    -( b^{1, 935}_2 ∧  b^{1, 935}_1 ∧  b^{1, 935}_0 ∧ true) 
c  in CNF:
c    -b^{1, 935}_2 ∨ -b^{1, 935}_1 ∨ -b^{1, 935}_0 ∨ false 
c  in DIMACS:
-3965 -3966 -3967  0

c i = 936
c  -2+1 --> -1
c    ( b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧  p_936) -> ( b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0)
c  in CNF:
c    -b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨  b^{1, 937}_2
c    -b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_1
c    -b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨  b^{1, 937}_0
c  in DIMACS:
-3968 -3969  3970 -936  3971 0
-3968 -3969  3970 -936 -3972 0
-3968 -3969  3970 -936  3973 0

c  -1+1 --> 0
c    ( b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0 ∧  p_936) -> (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧ -b^{1, 937}_0)
c  in CNF:
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_2
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_1
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_0
c  in DIMACS:
-3968  3969 -3970 -936 -3971 0
-3968  3969 -3970 -936 -3972 0
-3968  3969 -3970 -936 -3973 0

c  0+1 --> 1
c    (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧  p_936) -> (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0)
c  in CNF:
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_2
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_1
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨  b^{1, 937}_0
c  in DIMACS:
 3968  3969  3970 -936 -3971 0
 3968  3969  3970 -936 -3972 0
 3968  3969  3970 -936  3973 0

c  1+1 --> 2
c    (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0 ∧  p_936) -> (-b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0)
c  in CNF:
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_2
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨  b^{1, 937}_1
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ -p_936 ∨ -b^{1, 937}_0
c  in DIMACS:
 3968  3969 -3970 -936 -3971 0
 3968  3969 -3970 -936  3972 0
 3968  3969 -3970 -936 -3973 0

c  2+1 --> break 
c    (-b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧  p_936) -> break
c  in CNF:
c     b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 3968 -3969  3970 -936 1162 0


c  2-1 --> 1
c    (-b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧ -p_936) -> (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0)
c  in CNF:
c     b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_2
c     b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_1
c     b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨  b^{1, 937}_0
c  in DIMACS:
 3968 -3969  3970  936 -3971 0
 3968 -3969  3970  936 -3972 0
 3968 -3969  3970  936  3973 0

c  1-1 --> 0
c    (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0 ∧ -p_936) -> (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧ -b^{1, 937}_0)
c  in CNF:
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_2
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_1
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_0
c  in DIMACS:
 3968  3969 -3970  936 -3971 0
 3968  3969 -3970  936 -3972 0
 3968  3969 -3970  936 -3973 0

c  0-1 --> -1
c    (-b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧ -p_936) -> ( b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0)
c  in CNF:
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨  b^{1, 937}_2
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_1
c     b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨  b^{1, 937}_0
c  in DIMACS:
 3968  3969  3970  936  3971 0
 3968  3969  3970  936 -3972 0
 3968  3969  3970  936  3973 0

c  -1-1 --> -2
c    ( b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧  b^{1, 936}_0 ∧ -p_936) -> ( b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0)
c  in CNF:
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨  b^{1, 937}_2
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨  b^{1, 937}_1
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨  p_936 ∨ -b^{1, 937}_0
c  in DIMACS:
-3968  3969 -3970  936  3971 0
-3968  3969 -3970  936  3972 0
-3968  3969 -3970  936 -3973 0

c  -2-1 --> break 
c    ( b^{1, 936}_2 ∧  b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨  b^{1, 936}_0 ∨  p_936 ∨ break
c  in DIMACS:
-3968 -3969  3970  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 936}_2 ∧ -b^{1, 936}_1 ∧ -b^{1, 936}_0 ∧ true) 
c  in CNF:
c    -b^{1, 936}_2 ∨  b^{1, 936}_1 ∨  b^{1, 936}_0 ∨ false 
c  in DIMACS:
-3968  3969  3970  0

c  3 does not represent an automaton state.
c    -(-b^{1, 936}_2 ∧  b^{1, 936}_1 ∧  b^{1, 936}_0 ∧ true) 
c  in CNF:
c     b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ false 
c  in DIMACS:
 3968 -3969 -3970  0
c  -3 does not represent an automaton state.
c    -( b^{1, 936}_2 ∧  b^{1, 936}_1 ∧  b^{1, 936}_0 ∧ true) 
c  in CNF:
c    -b^{1, 936}_2 ∨ -b^{1, 936}_1 ∨ -b^{1, 936}_0 ∨ false 
c  in DIMACS:
-3968 -3969 -3970  0

c i = 937
c  -2+1 --> -1
c    ( b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧  p_937) -> ( b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0)
c  in CNF:
c    -b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨  b^{1, 938}_2
c    -b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_1
c    -b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨  b^{1, 938}_0
c  in DIMACS:
-3971 -3972  3973 -937  3974 0
-3971 -3972  3973 -937 -3975 0
-3971 -3972  3973 -937  3976 0

c  -1+1 --> 0
c    ( b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0 ∧  p_937) -> (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧ -b^{1, 938}_0)
c  in CNF:
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_2
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_1
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_0
c  in DIMACS:
-3971  3972 -3973 -937 -3974 0
-3971  3972 -3973 -937 -3975 0
-3971  3972 -3973 -937 -3976 0

c  0+1 --> 1
c    (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧  p_937) -> (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0)
c  in CNF:
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_2
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_1
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨  b^{1, 938}_0
c  in DIMACS:
 3971  3972  3973 -937 -3974 0
 3971  3972  3973 -937 -3975 0
 3971  3972  3973 -937  3976 0

c  1+1 --> 2
c    (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0 ∧  p_937) -> (-b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0)
c  in CNF:
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_2
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨  b^{1, 938}_1
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ -p_937 ∨ -b^{1, 938}_0
c  in DIMACS:
 3971  3972 -3973 -937 -3974 0
 3971  3972 -3973 -937  3975 0
 3971  3972 -3973 -937 -3976 0

c  2+1 --> break 
c    (-b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧  p_937) -> break
c  in CNF:
c     b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ -p_937 ∨ break
c  in DIMACS:
 3971 -3972  3973 -937 1162 0


c  2-1 --> 1
c    (-b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧ -p_937) -> (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0)
c  in CNF:
c     b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_2
c     b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_1
c     b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨  b^{1, 938}_0
c  in DIMACS:
 3971 -3972  3973  937 -3974 0
 3971 -3972  3973  937 -3975 0
 3971 -3972  3973  937  3976 0

c  1-1 --> 0
c    (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0 ∧ -p_937) -> (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧ -b^{1, 938}_0)
c  in CNF:
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_2
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_1
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_0
c  in DIMACS:
 3971  3972 -3973  937 -3974 0
 3971  3972 -3973  937 -3975 0
 3971  3972 -3973  937 -3976 0

c  0-1 --> -1
c    (-b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧ -p_937) -> ( b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0)
c  in CNF:
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨  b^{1, 938}_2
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_1
c     b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨  b^{1, 938}_0
c  in DIMACS:
 3971  3972  3973  937  3974 0
 3971  3972  3973  937 -3975 0
 3971  3972  3973  937  3976 0

c  -1-1 --> -2
c    ( b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧  b^{1, 937}_0 ∧ -p_937) -> ( b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0)
c  in CNF:
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨  b^{1, 938}_2
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨  b^{1, 938}_1
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨  p_937 ∨ -b^{1, 938}_0
c  in DIMACS:
-3971  3972 -3973  937  3974 0
-3971  3972 -3973  937  3975 0
-3971  3972 -3973  937 -3976 0

c  -2-1 --> break 
c    ( b^{1, 937}_2 ∧  b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧ -p_937) -> break
c  in CNF:
c    -b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨  b^{1, 937}_0 ∨  p_937 ∨ break
c  in DIMACS:
-3971 -3972  3973  937 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 937}_2 ∧ -b^{1, 937}_1 ∧ -b^{1, 937}_0 ∧ true) 
c  in CNF:
c    -b^{1, 937}_2 ∨  b^{1, 937}_1 ∨  b^{1, 937}_0 ∨ false 
c  in DIMACS:
-3971  3972  3973  0

c  3 does not represent an automaton state.
c    -(-b^{1, 937}_2 ∧  b^{1, 937}_1 ∧  b^{1, 937}_0 ∧ true) 
c  in CNF:
c     b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ false 
c  in DIMACS:
 3971 -3972 -3973  0
c  -3 does not represent an automaton state.
c    -( b^{1, 937}_2 ∧  b^{1, 937}_1 ∧  b^{1, 937}_0 ∧ true) 
c  in CNF:
c    -b^{1, 937}_2 ∨ -b^{1, 937}_1 ∨ -b^{1, 937}_0 ∨ false 
c  in DIMACS:
-3971 -3972 -3973  0

c i = 938
c  -2+1 --> -1
c    ( b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧  p_938) -> ( b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0)
c  in CNF:
c    -b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨  b^{1, 939}_2
c    -b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_1
c    -b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨  b^{1, 939}_0
c  in DIMACS:
-3974 -3975  3976 -938  3977 0
-3974 -3975  3976 -938 -3978 0
-3974 -3975  3976 -938  3979 0

c  -1+1 --> 0
c    ( b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0 ∧  p_938) -> (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧ -b^{1, 939}_0)
c  in CNF:
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_2
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_1
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_0
c  in DIMACS:
-3974  3975 -3976 -938 -3977 0
-3974  3975 -3976 -938 -3978 0
-3974  3975 -3976 -938 -3979 0

c  0+1 --> 1
c    (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧  p_938) -> (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0)
c  in CNF:
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_2
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_1
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨  b^{1, 939}_0
c  in DIMACS:
 3974  3975  3976 -938 -3977 0
 3974  3975  3976 -938 -3978 0
 3974  3975  3976 -938  3979 0

c  1+1 --> 2
c    (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0 ∧  p_938) -> (-b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0)
c  in CNF:
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_2
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨  b^{1, 939}_1
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ -p_938 ∨ -b^{1, 939}_0
c  in DIMACS:
 3974  3975 -3976 -938 -3977 0
 3974  3975 -3976 -938  3978 0
 3974  3975 -3976 -938 -3979 0

c  2+1 --> break 
c    (-b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧  p_938) -> break
c  in CNF:
c     b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 3974 -3975  3976 -938 1162 0


c  2-1 --> 1
c    (-b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧ -p_938) -> (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0)
c  in CNF:
c     b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_2
c     b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_1
c     b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨  b^{1, 939}_0
c  in DIMACS:
 3974 -3975  3976  938 -3977 0
 3974 -3975  3976  938 -3978 0
 3974 -3975  3976  938  3979 0

c  1-1 --> 0
c    (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0 ∧ -p_938) -> (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧ -b^{1, 939}_0)
c  in CNF:
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_2
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_1
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_0
c  in DIMACS:
 3974  3975 -3976  938 -3977 0
 3974  3975 -3976  938 -3978 0
 3974  3975 -3976  938 -3979 0

c  0-1 --> -1
c    (-b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧ -p_938) -> ( b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0)
c  in CNF:
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨  b^{1, 939}_2
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_1
c     b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨  b^{1, 939}_0
c  in DIMACS:
 3974  3975  3976  938  3977 0
 3974  3975  3976  938 -3978 0
 3974  3975  3976  938  3979 0

c  -1-1 --> -2
c    ( b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧  b^{1, 938}_0 ∧ -p_938) -> ( b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0)
c  in CNF:
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨  b^{1, 939}_2
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨  b^{1, 939}_1
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨  p_938 ∨ -b^{1, 939}_0
c  in DIMACS:
-3974  3975 -3976  938  3977 0
-3974  3975 -3976  938  3978 0
-3974  3975 -3976  938 -3979 0

c  -2-1 --> break 
c    ( b^{1, 938}_2 ∧  b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨  b^{1, 938}_0 ∨  p_938 ∨ break
c  in DIMACS:
-3974 -3975  3976  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 938}_2 ∧ -b^{1, 938}_1 ∧ -b^{1, 938}_0 ∧ true) 
c  in CNF:
c    -b^{1, 938}_2 ∨  b^{1, 938}_1 ∨  b^{1, 938}_0 ∨ false 
c  in DIMACS:
-3974  3975  3976  0

c  3 does not represent an automaton state.
c    -(-b^{1, 938}_2 ∧  b^{1, 938}_1 ∧  b^{1, 938}_0 ∧ true) 
c  in CNF:
c     b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ false 
c  in DIMACS:
 3974 -3975 -3976  0
c  -3 does not represent an automaton state.
c    -( b^{1, 938}_2 ∧  b^{1, 938}_1 ∧  b^{1, 938}_0 ∧ true) 
c  in CNF:
c    -b^{1, 938}_2 ∨ -b^{1, 938}_1 ∨ -b^{1, 938}_0 ∨ false 
c  in DIMACS:
-3974 -3975 -3976  0

c i = 939
c  -2+1 --> -1
c    ( b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧  p_939) -> ( b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0)
c  in CNF:
c    -b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨  b^{1, 940}_2
c    -b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_1
c    -b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨  b^{1, 940}_0
c  in DIMACS:
-3977 -3978  3979 -939  3980 0
-3977 -3978  3979 -939 -3981 0
-3977 -3978  3979 -939  3982 0

c  -1+1 --> 0
c    ( b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0 ∧  p_939) -> (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧ -b^{1, 940}_0)
c  in CNF:
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_2
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_1
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_0
c  in DIMACS:
-3977  3978 -3979 -939 -3980 0
-3977  3978 -3979 -939 -3981 0
-3977  3978 -3979 -939 -3982 0

c  0+1 --> 1
c    (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧  p_939) -> (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0)
c  in CNF:
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_2
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_1
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨  b^{1, 940}_0
c  in DIMACS:
 3977  3978  3979 -939 -3980 0
 3977  3978  3979 -939 -3981 0
 3977  3978  3979 -939  3982 0

c  1+1 --> 2
c    (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0 ∧  p_939) -> (-b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0)
c  in CNF:
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_2
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨  b^{1, 940}_1
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ -p_939 ∨ -b^{1, 940}_0
c  in DIMACS:
 3977  3978 -3979 -939 -3980 0
 3977  3978 -3979 -939  3981 0
 3977  3978 -3979 -939 -3982 0

c  2+1 --> break 
c    (-b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧  p_939) -> break
c  in CNF:
c     b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ -p_939 ∨ break
c  in DIMACS:
 3977 -3978  3979 -939 1162 0


c  2-1 --> 1
c    (-b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧ -p_939) -> (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0)
c  in CNF:
c     b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_2
c     b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_1
c     b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨  b^{1, 940}_0
c  in DIMACS:
 3977 -3978  3979  939 -3980 0
 3977 -3978  3979  939 -3981 0
 3977 -3978  3979  939  3982 0

c  1-1 --> 0
c    (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0 ∧ -p_939) -> (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧ -b^{1, 940}_0)
c  in CNF:
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_2
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_1
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_0
c  in DIMACS:
 3977  3978 -3979  939 -3980 0
 3977  3978 -3979  939 -3981 0
 3977  3978 -3979  939 -3982 0

c  0-1 --> -1
c    (-b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧ -p_939) -> ( b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0)
c  in CNF:
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨  b^{1, 940}_2
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_1
c     b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨  b^{1, 940}_0
c  in DIMACS:
 3977  3978  3979  939  3980 0
 3977  3978  3979  939 -3981 0
 3977  3978  3979  939  3982 0

c  -1-1 --> -2
c    ( b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧  b^{1, 939}_0 ∧ -p_939) -> ( b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0)
c  in CNF:
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨  b^{1, 940}_2
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨  b^{1, 940}_1
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨  p_939 ∨ -b^{1, 940}_0
c  in DIMACS:
-3977  3978 -3979  939  3980 0
-3977  3978 -3979  939  3981 0
-3977  3978 -3979  939 -3982 0

c  -2-1 --> break 
c    ( b^{1, 939}_2 ∧  b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧ -p_939) -> break
c  in CNF:
c    -b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨  b^{1, 939}_0 ∨  p_939 ∨ break
c  in DIMACS:
-3977 -3978  3979  939 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 939}_2 ∧ -b^{1, 939}_1 ∧ -b^{1, 939}_0 ∧ true) 
c  in CNF:
c    -b^{1, 939}_2 ∨  b^{1, 939}_1 ∨  b^{1, 939}_0 ∨ false 
c  in DIMACS:
-3977  3978  3979  0

c  3 does not represent an automaton state.
c    -(-b^{1, 939}_2 ∧  b^{1, 939}_1 ∧  b^{1, 939}_0 ∧ true) 
c  in CNF:
c     b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ false 
c  in DIMACS:
 3977 -3978 -3979  0
c  -3 does not represent an automaton state.
c    -( b^{1, 939}_2 ∧  b^{1, 939}_1 ∧  b^{1, 939}_0 ∧ true) 
c  in CNF:
c    -b^{1, 939}_2 ∨ -b^{1, 939}_1 ∨ -b^{1, 939}_0 ∨ false 
c  in DIMACS:
-3977 -3978 -3979  0

c i = 940
c  -2+1 --> -1
c    ( b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧  p_940) -> ( b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0)
c  in CNF:
c    -b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨  b^{1, 941}_2
c    -b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_1
c    -b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨  b^{1, 941}_0
c  in DIMACS:
-3980 -3981  3982 -940  3983 0
-3980 -3981  3982 -940 -3984 0
-3980 -3981  3982 -940  3985 0

c  -1+1 --> 0
c    ( b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0 ∧  p_940) -> (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧ -b^{1, 941}_0)
c  in CNF:
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_2
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_1
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_0
c  in DIMACS:
-3980  3981 -3982 -940 -3983 0
-3980  3981 -3982 -940 -3984 0
-3980  3981 -3982 -940 -3985 0

c  0+1 --> 1
c    (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧  p_940) -> (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0)
c  in CNF:
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_2
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_1
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨  b^{1, 941}_0
c  in DIMACS:
 3980  3981  3982 -940 -3983 0
 3980  3981  3982 -940 -3984 0
 3980  3981  3982 -940  3985 0

c  1+1 --> 2
c    (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0 ∧  p_940) -> (-b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0)
c  in CNF:
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_2
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨  b^{1, 941}_1
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ -p_940 ∨ -b^{1, 941}_0
c  in DIMACS:
 3980  3981 -3982 -940 -3983 0
 3980  3981 -3982 -940  3984 0
 3980  3981 -3982 -940 -3985 0

c  2+1 --> break 
c    (-b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧  p_940) -> break
c  in CNF:
c     b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 3980 -3981  3982 -940 1162 0


c  2-1 --> 1
c    (-b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧ -p_940) -> (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0)
c  in CNF:
c     b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_2
c     b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_1
c     b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨  b^{1, 941}_0
c  in DIMACS:
 3980 -3981  3982  940 -3983 0
 3980 -3981  3982  940 -3984 0
 3980 -3981  3982  940  3985 0

c  1-1 --> 0
c    (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0 ∧ -p_940) -> (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧ -b^{1, 941}_0)
c  in CNF:
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_2
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_1
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_0
c  in DIMACS:
 3980  3981 -3982  940 -3983 0
 3980  3981 -3982  940 -3984 0
 3980  3981 -3982  940 -3985 0

c  0-1 --> -1
c    (-b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧ -p_940) -> ( b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0)
c  in CNF:
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨  b^{1, 941}_2
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_1
c     b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨  b^{1, 941}_0
c  in DIMACS:
 3980  3981  3982  940  3983 0
 3980  3981  3982  940 -3984 0
 3980  3981  3982  940  3985 0

c  -1-1 --> -2
c    ( b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧  b^{1, 940}_0 ∧ -p_940) -> ( b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0)
c  in CNF:
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨  b^{1, 941}_2
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨  b^{1, 941}_1
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨  p_940 ∨ -b^{1, 941}_0
c  in DIMACS:
-3980  3981 -3982  940  3983 0
-3980  3981 -3982  940  3984 0
-3980  3981 -3982  940 -3985 0

c  -2-1 --> break 
c    ( b^{1, 940}_2 ∧  b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨  b^{1, 940}_0 ∨  p_940 ∨ break
c  in DIMACS:
-3980 -3981  3982  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 940}_2 ∧ -b^{1, 940}_1 ∧ -b^{1, 940}_0 ∧ true) 
c  in CNF:
c    -b^{1, 940}_2 ∨  b^{1, 940}_1 ∨  b^{1, 940}_0 ∨ false 
c  in DIMACS:
-3980  3981  3982  0

c  3 does not represent an automaton state.
c    -(-b^{1, 940}_2 ∧  b^{1, 940}_1 ∧  b^{1, 940}_0 ∧ true) 
c  in CNF:
c     b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ false 
c  in DIMACS:
 3980 -3981 -3982  0
c  -3 does not represent an automaton state.
c    -( b^{1, 940}_2 ∧  b^{1, 940}_1 ∧  b^{1, 940}_0 ∧ true) 
c  in CNF:
c    -b^{1, 940}_2 ∨ -b^{1, 940}_1 ∨ -b^{1, 940}_0 ∨ false 
c  in DIMACS:
-3980 -3981 -3982  0

c i = 941
c  -2+1 --> -1
c    ( b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧  p_941) -> ( b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0)
c  in CNF:
c    -b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨  b^{1, 942}_2
c    -b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_1
c    -b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨  b^{1, 942}_0
c  in DIMACS:
-3983 -3984  3985 -941  3986 0
-3983 -3984  3985 -941 -3987 0
-3983 -3984  3985 -941  3988 0

c  -1+1 --> 0
c    ( b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0 ∧  p_941) -> (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧ -b^{1, 942}_0)
c  in CNF:
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_2
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_1
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_0
c  in DIMACS:
-3983  3984 -3985 -941 -3986 0
-3983  3984 -3985 -941 -3987 0
-3983  3984 -3985 -941 -3988 0

c  0+1 --> 1
c    (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧  p_941) -> (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0)
c  in CNF:
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_2
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_1
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨  b^{1, 942}_0
c  in DIMACS:
 3983  3984  3985 -941 -3986 0
 3983  3984  3985 -941 -3987 0
 3983  3984  3985 -941  3988 0

c  1+1 --> 2
c    (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0 ∧  p_941) -> (-b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0)
c  in CNF:
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_2
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨  b^{1, 942}_1
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ -p_941 ∨ -b^{1, 942}_0
c  in DIMACS:
 3983  3984 -3985 -941 -3986 0
 3983  3984 -3985 -941  3987 0
 3983  3984 -3985 -941 -3988 0

c  2+1 --> break 
c    (-b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧  p_941) -> break
c  in CNF:
c     b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ -p_941 ∨ break
c  in DIMACS:
 3983 -3984  3985 -941 1162 0


c  2-1 --> 1
c    (-b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧ -p_941) -> (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0)
c  in CNF:
c     b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_2
c     b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_1
c     b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨  b^{1, 942}_0
c  in DIMACS:
 3983 -3984  3985  941 -3986 0
 3983 -3984  3985  941 -3987 0
 3983 -3984  3985  941  3988 0

c  1-1 --> 0
c    (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0 ∧ -p_941) -> (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧ -b^{1, 942}_0)
c  in CNF:
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_2
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_1
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_0
c  in DIMACS:
 3983  3984 -3985  941 -3986 0
 3983  3984 -3985  941 -3987 0
 3983  3984 -3985  941 -3988 0

c  0-1 --> -1
c    (-b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧ -p_941) -> ( b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0)
c  in CNF:
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨  b^{1, 942}_2
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_1
c     b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨  b^{1, 942}_0
c  in DIMACS:
 3983  3984  3985  941  3986 0
 3983  3984  3985  941 -3987 0
 3983  3984  3985  941  3988 0

c  -1-1 --> -2
c    ( b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧  b^{1, 941}_0 ∧ -p_941) -> ( b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0)
c  in CNF:
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨  b^{1, 942}_2
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨  b^{1, 942}_1
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨  p_941 ∨ -b^{1, 942}_0
c  in DIMACS:
-3983  3984 -3985  941  3986 0
-3983  3984 -3985  941  3987 0
-3983  3984 -3985  941 -3988 0

c  -2-1 --> break 
c    ( b^{1, 941}_2 ∧  b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧ -p_941) -> break
c  in CNF:
c    -b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨  b^{1, 941}_0 ∨  p_941 ∨ break
c  in DIMACS:
-3983 -3984  3985  941 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 941}_2 ∧ -b^{1, 941}_1 ∧ -b^{1, 941}_0 ∧ true) 
c  in CNF:
c    -b^{1, 941}_2 ∨  b^{1, 941}_1 ∨  b^{1, 941}_0 ∨ false 
c  in DIMACS:
-3983  3984  3985  0

c  3 does not represent an automaton state.
c    -(-b^{1, 941}_2 ∧  b^{1, 941}_1 ∧  b^{1, 941}_0 ∧ true) 
c  in CNF:
c     b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ false 
c  in DIMACS:
 3983 -3984 -3985  0
c  -3 does not represent an automaton state.
c    -( b^{1, 941}_2 ∧  b^{1, 941}_1 ∧  b^{1, 941}_0 ∧ true) 
c  in CNF:
c    -b^{1, 941}_2 ∨ -b^{1, 941}_1 ∨ -b^{1, 941}_0 ∨ false 
c  in DIMACS:
-3983 -3984 -3985  0

c i = 942
c  -2+1 --> -1
c    ( b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧  p_942) -> ( b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0)
c  in CNF:
c    -b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨  b^{1, 943}_2
c    -b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_1
c    -b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨  b^{1, 943}_0
c  in DIMACS:
-3986 -3987  3988 -942  3989 0
-3986 -3987  3988 -942 -3990 0
-3986 -3987  3988 -942  3991 0

c  -1+1 --> 0
c    ( b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0 ∧  p_942) -> (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧ -b^{1, 943}_0)
c  in CNF:
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_2
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_1
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_0
c  in DIMACS:
-3986  3987 -3988 -942 -3989 0
-3986  3987 -3988 -942 -3990 0
-3986  3987 -3988 -942 -3991 0

c  0+1 --> 1
c    (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧  p_942) -> (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0)
c  in CNF:
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_2
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_1
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨  b^{1, 943}_0
c  in DIMACS:
 3986  3987  3988 -942 -3989 0
 3986  3987  3988 -942 -3990 0
 3986  3987  3988 -942  3991 0

c  1+1 --> 2
c    (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0 ∧  p_942) -> (-b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0)
c  in CNF:
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_2
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨  b^{1, 943}_1
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ -p_942 ∨ -b^{1, 943}_0
c  in DIMACS:
 3986  3987 -3988 -942 -3989 0
 3986  3987 -3988 -942  3990 0
 3986  3987 -3988 -942 -3991 0

c  2+1 --> break 
c    (-b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧  p_942) -> break
c  in CNF:
c     b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 3986 -3987  3988 -942 1162 0


c  2-1 --> 1
c    (-b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧ -p_942) -> (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0)
c  in CNF:
c     b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_2
c     b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_1
c     b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨  b^{1, 943}_0
c  in DIMACS:
 3986 -3987  3988  942 -3989 0
 3986 -3987  3988  942 -3990 0
 3986 -3987  3988  942  3991 0

c  1-1 --> 0
c    (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0 ∧ -p_942) -> (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧ -b^{1, 943}_0)
c  in CNF:
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_2
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_1
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_0
c  in DIMACS:
 3986  3987 -3988  942 -3989 0
 3986  3987 -3988  942 -3990 0
 3986  3987 -3988  942 -3991 0

c  0-1 --> -1
c    (-b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧ -p_942) -> ( b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0)
c  in CNF:
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨  b^{1, 943}_2
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_1
c     b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨  b^{1, 943}_0
c  in DIMACS:
 3986  3987  3988  942  3989 0
 3986  3987  3988  942 -3990 0
 3986  3987  3988  942  3991 0

c  -1-1 --> -2
c    ( b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧  b^{1, 942}_0 ∧ -p_942) -> ( b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0)
c  in CNF:
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨  b^{1, 943}_2
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨  b^{1, 943}_1
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨  p_942 ∨ -b^{1, 943}_0
c  in DIMACS:
-3986  3987 -3988  942  3989 0
-3986  3987 -3988  942  3990 0
-3986  3987 -3988  942 -3991 0

c  -2-1 --> break 
c    ( b^{1, 942}_2 ∧  b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨  b^{1, 942}_0 ∨  p_942 ∨ break
c  in DIMACS:
-3986 -3987  3988  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 942}_2 ∧ -b^{1, 942}_1 ∧ -b^{1, 942}_0 ∧ true) 
c  in CNF:
c    -b^{1, 942}_2 ∨  b^{1, 942}_1 ∨  b^{1, 942}_0 ∨ false 
c  in DIMACS:
-3986  3987  3988  0

c  3 does not represent an automaton state.
c    -(-b^{1, 942}_2 ∧  b^{1, 942}_1 ∧  b^{1, 942}_0 ∧ true) 
c  in CNF:
c     b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ false 
c  in DIMACS:
 3986 -3987 -3988  0
c  -3 does not represent an automaton state.
c    -( b^{1, 942}_2 ∧  b^{1, 942}_1 ∧  b^{1, 942}_0 ∧ true) 
c  in CNF:
c    -b^{1, 942}_2 ∨ -b^{1, 942}_1 ∨ -b^{1, 942}_0 ∨ false 
c  in DIMACS:
-3986 -3987 -3988  0

c i = 943
c  -2+1 --> -1
c    ( b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧  p_943) -> ( b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0)
c  in CNF:
c    -b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨  b^{1, 944}_2
c    -b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_1
c    -b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨  b^{1, 944}_0
c  in DIMACS:
-3989 -3990  3991 -943  3992 0
-3989 -3990  3991 -943 -3993 0
-3989 -3990  3991 -943  3994 0

c  -1+1 --> 0
c    ( b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0 ∧  p_943) -> (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧ -b^{1, 944}_0)
c  in CNF:
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_2
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_1
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_0
c  in DIMACS:
-3989  3990 -3991 -943 -3992 0
-3989  3990 -3991 -943 -3993 0
-3989  3990 -3991 -943 -3994 0

c  0+1 --> 1
c    (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧  p_943) -> (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0)
c  in CNF:
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_2
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_1
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨  b^{1, 944}_0
c  in DIMACS:
 3989  3990  3991 -943 -3992 0
 3989  3990  3991 -943 -3993 0
 3989  3990  3991 -943  3994 0

c  1+1 --> 2
c    (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0 ∧  p_943) -> (-b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0)
c  in CNF:
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_2
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨  b^{1, 944}_1
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ -p_943 ∨ -b^{1, 944}_0
c  in DIMACS:
 3989  3990 -3991 -943 -3992 0
 3989  3990 -3991 -943  3993 0
 3989  3990 -3991 -943 -3994 0

c  2+1 --> break 
c    (-b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧  p_943) -> break
c  in CNF:
c     b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ -p_943 ∨ break
c  in DIMACS:
 3989 -3990  3991 -943 1162 0


c  2-1 --> 1
c    (-b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧ -p_943) -> (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0)
c  in CNF:
c     b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_2
c     b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_1
c     b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨  b^{1, 944}_0
c  in DIMACS:
 3989 -3990  3991  943 -3992 0
 3989 -3990  3991  943 -3993 0
 3989 -3990  3991  943  3994 0

c  1-1 --> 0
c    (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0 ∧ -p_943) -> (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧ -b^{1, 944}_0)
c  in CNF:
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_2
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_1
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_0
c  in DIMACS:
 3989  3990 -3991  943 -3992 0
 3989  3990 -3991  943 -3993 0
 3989  3990 -3991  943 -3994 0

c  0-1 --> -1
c    (-b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧ -p_943) -> ( b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0)
c  in CNF:
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨  b^{1, 944}_2
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_1
c     b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨  b^{1, 944}_0
c  in DIMACS:
 3989  3990  3991  943  3992 0
 3989  3990  3991  943 -3993 0
 3989  3990  3991  943  3994 0

c  -1-1 --> -2
c    ( b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧  b^{1, 943}_0 ∧ -p_943) -> ( b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0)
c  in CNF:
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨  b^{1, 944}_2
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨  b^{1, 944}_1
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨  p_943 ∨ -b^{1, 944}_0
c  in DIMACS:
-3989  3990 -3991  943  3992 0
-3989  3990 -3991  943  3993 0
-3989  3990 -3991  943 -3994 0

c  -2-1 --> break 
c    ( b^{1, 943}_2 ∧  b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧ -p_943) -> break
c  in CNF:
c    -b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨  b^{1, 943}_0 ∨  p_943 ∨ break
c  in DIMACS:
-3989 -3990  3991  943 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 943}_2 ∧ -b^{1, 943}_1 ∧ -b^{1, 943}_0 ∧ true) 
c  in CNF:
c    -b^{1, 943}_2 ∨  b^{1, 943}_1 ∨  b^{1, 943}_0 ∨ false 
c  in DIMACS:
-3989  3990  3991  0

c  3 does not represent an automaton state.
c    -(-b^{1, 943}_2 ∧  b^{1, 943}_1 ∧  b^{1, 943}_0 ∧ true) 
c  in CNF:
c     b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ false 
c  in DIMACS:
 3989 -3990 -3991  0
c  -3 does not represent an automaton state.
c    -( b^{1, 943}_2 ∧  b^{1, 943}_1 ∧  b^{1, 943}_0 ∧ true) 
c  in CNF:
c    -b^{1, 943}_2 ∨ -b^{1, 943}_1 ∨ -b^{1, 943}_0 ∨ false 
c  in DIMACS:
-3989 -3990 -3991  0

c i = 944
c  -2+1 --> -1
c    ( b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧  p_944) -> ( b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0)
c  in CNF:
c    -b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨  b^{1, 945}_2
c    -b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_1
c    -b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨  b^{1, 945}_0
c  in DIMACS:
-3992 -3993  3994 -944  3995 0
-3992 -3993  3994 -944 -3996 0
-3992 -3993  3994 -944  3997 0

c  -1+1 --> 0
c    ( b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0 ∧  p_944) -> (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧ -b^{1, 945}_0)
c  in CNF:
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_2
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_1
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_0
c  in DIMACS:
-3992  3993 -3994 -944 -3995 0
-3992  3993 -3994 -944 -3996 0
-3992  3993 -3994 -944 -3997 0

c  0+1 --> 1
c    (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧  p_944) -> (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0)
c  in CNF:
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_2
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_1
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨  b^{1, 945}_0
c  in DIMACS:
 3992  3993  3994 -944 -3995 0
 3992  3993  3994 -944 -3996 0
 3992  3993  3994 -944  3997 0

c  1+1 --> 2
c    (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0 ∧  p_944) -> (-b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0)
c  in CNF:
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_2
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨  b^{1, 945}_1
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ -p_944 ∨ -b^{1, 945}_0
c  in DIMACS:
 3992  3993 -3994 -944 -3995 0
 3992  3993 -3994 -944  3996 0
 3992  3993 -3994 -944 -3997 0

c  2+1 --> break 
c    (-b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧  p_944) -> break
c  in CNF:
c     b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 3992 -3993  3994 -944 1162 0


c  2-1 --> 1
c    (-b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧ -p_944) -> (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0)
c  in CNF:
c     b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_2
c     b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_1
c     b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨  b^{1, 945}_0
c  in DIMACS:
 3992 -3993  3994  944 -3995 0
 3992 -3993  3994  944 -3996 0
 3992 -3993  3994  944  3997 0

c  1-1 --> 0
c    (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0 ∧ -p_944) -> (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧ -b^{1, 945}_0)
c  in CNF:
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_2
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_1
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_0
c  in DIMACS:
 3992  3993 -3994  944 -3995 0
 3992  3993 -3994  944 -3996 0
 3992  3993 -3994  944 -3997 0

c  0-1 --> -1
c    (-b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧ -p_944) -> ( b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0)
c  in CNF:
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨  b^{1, 945}_2
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_1
c     b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨  b^{1, 945}_0
c  in DIMACS:
 3992  3993  3994  944  3995 0
 3992  3993  3994  944 -3996 0
 3992  3993  3994  944  3997 0

c  -1-1 --> -2
c    ( b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧  b^{1, 944}_0 ∧ -p_944) -> ( b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0)
c  in CNF:
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨  b^{1, 945}_2
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨  b^{1, 945}_1
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨  p_944 ∨ -b^{1, 945}_0
c  in DIMACS:
-3992  3993 -3994  944  3995 0
-3992  3993 -3994  944  3996 0
-3992  3993 -3994  944 -3997 0

c  -2-1 --> break 
c    ( b^{1, 944}_2 ∧  b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨  b^{1, 944}_0 ∨  p_944 ∨ break
c  in DIMACS:
-3992 -3993  3994  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 944}_2 ∧ -b^{1, 944}_1 ∧ -b^{1, 944}_0 ∧ true) 
c  in CNF:
c    -b^{1, 944}_2 ∨  b^{1, 944}_1 ∨  b^{1, 944}_0 ∨ false 
c  in DIMACS:
-3992  3993  3994  0

c  3 does not represent an automaton state.
c    -(-b^{1, 944}_2 ∧  b^{1, 944}_1 ∧  b^{1, 944}_0 ∧ true) 
c  in CNF:
c     b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ false 
c  in DIMACS:
 3992 -3993 -3994  0
c  -3 does not represent an automaton state.
c    -( b^{1, 944}_2 ∧  b^{1, 944}_1 ∧  b^{1, 944}_0 ∧ true) 
c  in CNF:
c    -b^{1, 944}_2 ∨ -b^{1, 944}_1 ∨ -b^{1, 944}_0 ∨ false 
c  in DIMACS:
-3992 -3993 -3994  0

c i = 945
c  -2+1 --> -1
c    ( b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧  p_945) -> ( b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0)
c  in CNF:
c    -b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨  b^{1, 946}_2
c    -b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_1
c    -b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨  b^{1, 946}_0
c  in DIMACS:
-3995 -3996  3997 -945  3998 0
-3995 -3996  3997 -945 -3999 0
-3995 -3996  3997 -945  4000 0

c  -1+1 --> 0
c    ( b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0 ∧  p_945) -> (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧ -b^{1, 946}_0)
c  in CNF:
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_2
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_1
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_0
c  in DIMACS:
-3995  3996 -3997 -945 -3998 0
-3995  3996 -3997 -945 -3999 0
-3995  3996 -3997 -945 -4000 0

c  0+1 --> 1
c    (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧  p_945) -> (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0)
c  in CNF:
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_2
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_1
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨  b^{1, 946}_0
c  in DIMACS:
 3995  3996  3997 -945 -3998 0
 3995  3996  3997 -945 -3999 0
 3995  3996  3997 -945  4000 0

c  1+1 --> 2
c    (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0 ∧  p_945) -> (-b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0)
c  in CNF:
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_2
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨  b^{1, 946}_1
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ -p_945 ∨ -b^{1, 946}_0
c  in DIMACS:
 3995  3996 -3997 -945 -3998 0
 3995  3996 -3997 -945  3999 0
 3995  3996 -3997 -945 -4000 0

c  2+1 --> break 
c    (-b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧  p_945) -> break
c  in CNF:
c     b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 3995 -3996  3997 -945 1162 0


c  2-1 --> 1
c    (-b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧ -p_945) -> (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0)
c  in CNF:
c     b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_2
c     b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_1
c     b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨  b^{1, 946}_0
c  in DIMACS:
 3995 -3996  3997  945 -3998 0
 3995 -3996  3997  945 -3999 0
 3995 -3996  3997  945  4000 0

c  1-1 --> 0
c    (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0 ∧ -p_945) -> (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧ -b^{1, 946}_0)
c  in CNF:
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_2
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_1
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_0
c  in DIMACS:
 3995  3996 -3997  945 -3998 0
 3995  3996 -3997  945 -3999 0
 3995  3996 -3997  945 -4000 0

c  0-1 --> -1
c    (-b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧ -p_945) -> ( b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0)
c  in CNF:
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨  b^{1, 946}_2
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_1
c     b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨  b^{1, 946}_0
c  in DIMACS:
 3995  3996  3997  945  3998 0
 3995  3996  3997  945 -3999 0
 3995  3996  3997  945  4000 0

c  -1-1 --> -2
c    ( b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧  b^{1, 945}_0 ∧ -p_945) -> ( b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0)
c  in CNF:
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨  b^{1, 946}_2
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨  b^{1, 946}_1
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨  p_945 ∨ -b^{1, 946}_0
c  in DIMACS:
-3995  3996 -3997  945  3998 0
-3995  3996 -3997  945  3999 0
-3995  3996 -3997  945 -4000 0

c  -2-1 --> break 
c    ( b^{1, 945}_2 ∧  b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨  b^{1, 945}_0 ∨  p_945 ∨ break
c  in DIMACS:
-3995 -3996  3997  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 945}_2 ∧ -b^{1, 945}_1 ∧ -b^{1, 945}_0 ∧ true) 
c  in CNF:
c    -b^{1, 945}_2 ∨  b^{1, 945}_1 ∨  b^{1, 945}_0 ∨ false 
c  in DIMACS:
-3995  3996  3997  0

c  3 does not represent an automaton state.
c    -(-b^{1, 945}_2 ∧  b^{1, 945}_1 ∧  b^{1, 945}_0 ∧ true) 
c  in CNF:
c     b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ false 
c  in DIMACS:
 3995 -3996 -3997  0
c  -3 does not represent an automaton state.
c    -( b^{1, 945}_2 ∧  b^{1, 945}_1 ∧  b^{1, 945}_0 ∧ true) 
c  in CNF:
c    -b^{1, 945}_2 ∨ -b^{1, 945}_1 ∨ -b^{1, 945}_0 ∨ false 
c  in DIMACS:
-3995 -3996 -3997  0

c i = 946
c  -2+1 --> -1
c    ( b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧  p_946) -> ( b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0)
c  in CNF:
c    -b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨  b^{1, 947}_2
c    -b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_1
c    -b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨  b^{1, 947}_0
c  in DIMACS:
-3998 -3999  4000 -946  4001 0
-3998 -3999  4000 -946 -4002 0
-3998 -3999  4000 -946  4003 0

c  -1+1 --> 0
c    ( b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0 ∧  p_946) -> (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧ -b^{1, 947}_0)
c  in CNF:
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_2
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_1
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_0
c  in DIMACS:
-3998  3999 -4000 -946 -4001 0
-3998  3999 -4000 -946 -4002 0
-3998  3999 -4000 -946 -4003 0

c  0+1 --> 1
c    (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧  p_946) -> (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0)
c  in CNF:
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_2
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_1
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨  b^{1, 947}_0
c  in DIMACS:
 3998  3999  4000 -946 -4001 0
 3998  3999  4000 -946 -4002 0
 3998  3999  4000 -946  4003 0

c  1+1 --> 2
c    (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0 ∧  p_946) -> (-b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0)
c  in CNF:
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_2
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨  b^{1, 947}_1
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ -p_946 ∨ -b^{1, 947}_0
c  in DIMACS:
 3998  3999 -4000 -946 -4001 0
 3998  3999 -4000 -946  4002 0
 3998  3999 -4000 -946 -4003 0

c  2+1 --> break 
c    (-b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧  p_946) -> break
c  in CNF:
c     b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 3998 -3999  4000 -946 1162 0


c  2-1 --> 1
c    (-b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧ -p_946) -> (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0)
c  in CNF:
c     b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_2
c     b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_1
c     b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨  b^{1, 947}_0
c  in DIMACS:
 3998 -3999  4000  946 -4001 0
 3998 -3999  4000  946 -4002 0
 3998 -3999  4000  946  4003 0

c  1-1 --> 0
c    (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0 ∧ -p_946) -> (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧ -b^{1, 947}_0)
c  in CNF:
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_2
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_1
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_0
c  in DIMACS:
 3998  3999 -4000  946 -4001 0
 3998  3999 -4000  946 -4002 0
 3998  3999 -4000  946 -4003 0

c  0-1 --> -1
c    (-b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧ -p_946) -> ( b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0)
c  in CNF:
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨  b^{1, 947}_2
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_1
c     b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨  b^{1, 947}_0
c  in DIMACS:
 3998  3999  4000  946  4001 0
 3998  3999  4000  946 -4002 0
 3998  3999  4000  946  4003 0

c  -1-1 --> -2
c    ( b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧  b^{1, 946}_0 ∧ -p_946) -> ( b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0)
c  in CNF:
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨  b^{1, 947}_2
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨  b^{1, 947}_1
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨  p_946 ∨ -b^{1, 947}_0
c  in DIMACS:
-3998  3999 -4000  946  4001 0
-3998  3999 -4000  946  4002 0
-3998  3999 -4000  946 -4003 0

c  -2-1 --> break 
c    ( b^{1, 946}_2 ∧  b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨  b^{1, 946}_0 ∨  p_946 ∨ break
c  in DIMACS:
-3998 -3999  4000  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 946}_2 ∧ -b^{1, 946}_1 ∧ -b^{1, 946}_0 ∧ true) 
c  in CNF:
c    -b^{1, 946}_2 ∨  b^{1, 946}_1 ∨  b^{1, 946}_0 ∨ false 
c  in DIMACS:
-3998  3999  4000  0

c  3 does not represent an automaton state.
c    -(-b^{1, 946}_2 ∧  b^{1, 946}_1 ∧  b^{1, 946}_0 ∧ true) 
c  in CNF:
c     b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ false 
c  in DIMACS:
 3998 -3999 -4000  0
c  -3 does not represent an automaton state.
c    -( b^{1, 946}_2 ∧  b^{1, 946}_1 ∧  b^{1, 946}_0 ∧ true) 
c  in CNF:
c    -b^{1, 946}_2 ∨ -b^{1, 946}_1 ∨ -b^{1, 946}_0 ∨ false 
c  in DIMACS:
-3998 -3999 -4000  0

c i = 947
c  -2+1 --> -1
c    ( b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧  p_947) -> ( b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0)
c  in CNF:
c    -b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨  b^{1, 948}_2
c    -b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_1
c    -b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨  b^{1, 948}_0
c  in DIMACS:
-4001 -4002  4003 -947  4004 0
-4001 -4002  4003 -947 -4005 0
-4001 -4002  4003 -947  4006 0

c  -1+1 --> 0
c    ( b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0 ∧  p_947) -> (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧ -b^{1, 948}_0)
c  in CNF:
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_2
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_1
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_0
c  in DIMACS:
-4001  4002 -4003 -947 -4004 0
-4001  4002 -4003 -947 -4005 0
-4001  4002 -4003 -947 -4006 0

c  0+1 --> 1
c    (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧  p_947) -> (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0)
c  in CNF:
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_2
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_1
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨  b^{1, 948}_0
c  in DIMACS:
 4001  4002  4003 -947 -4004 0
 4001  4002  4003 -947 -4005 0
 4001  4002  4003 -947  4006 0

c  1+1 --> 2
c    (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0 ∧  p_947) -> (-b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0)
c  in CNF:
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_2
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨  b^{1, 948}_1
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ -p_947 ∨ -b^{1, 948}_0
c  in DIMACS:
 4001  4002 -4003 -947 -4004 0
 4001  4002 -4003 -947  4005 0
 4001  4002 -4003 -947 -4006 0

c  2+1 --> break 
c    (-b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧  p_947) -> break
c  in CNF:
c     b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ -p_947 ∨ break
c  in DIMACS:
 4001 -4002  4003 -947 1162 0


c  2-1 --> 1
c    (-b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧ -p_947) -> (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0)
c  in CNF:
c     b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_2
c     b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_1
c     b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨  b^{1, 948}_0
c  in DIMACS:
 4001 -4002  4003  947 -4004 0
 4001 -4002  4003  947 -4005 0
 4001 -4002  4003  947  4006 0

c  1-1 --> 0
c    (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0 ∧ -p_947) -> (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧ -b^{1, 948}_0)
c  in CNF:
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_2
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_1
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_0
c  in DIMACS:
 4001  4002 -4003  947 -4004 0
 4001  4002 -4003  947 -4005 0
 4001  4002 -4003  947 -4006 0

c  0-1 --> -1
c    (-b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧ -p_947) -> ( b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0)
c  in CNF:
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨  b^{1, 948}_2
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_1
c     b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨  b^{1, 948}_0
c  in DIMACS:
 4001  4002  4003  947  4004 0
 4001  4002  4003  947 -4005 0
 4001  4002  4003  947  4006 0

c  -1-1 --> -2
c    ( b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧  b^{1, 947}_0 ∧ -p_947) -> ( b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0)
c  in CNF:
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨  b^{1, 948}_2
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨  b^{1, 948}_1
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨  p_947 ∨ -b^{1, 948}_0
c  in DIMACS:
-4001  4002 -4003  947  4004 0
-4001  4002 -4003  947  4005 0
-4001  4002 -4003  947 -4006 0

c  -2-1 --> break 
c    ( b^{1, 947}_2 ∧  b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧ -p_947) -> break
c  in CNF:
c    -b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨  b^{1, 947}_0 ∨  p_947 ∨ break
c  in DIMACS:
-4001 -4002  4003  947 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 947}_2 ∧ -b^{1, 947}_1 ∧ -b^{1, 947}_0 ∧ true) 
c  in CNF:
c    -b^{1, 947}_2 ∨  b^{1, 947}_1 ∨  b^{1, 947}_0 ∨ false 
c  in DIMACS:
-4001  4002  4003  0

c  3 does not represent an automaton state.
c    -(-b^{1, 947}_2 ∧  b^{1, 947}_1 ∧  b^{1, 947}_0 ∧ true) 
c  in CNF:
c     b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ false 
c  in DIMACS:
 4001 -4002 -4003  0
c  -3 does not represent an automaton state.
c    -( b^{1, 947}_2 ∧  b^{1, 947}_1 ∧  b^{1, 947}_0 ∧ true) 
c  in CNF:
c    -b^{1, 947}_2 ∨ -b^{1, 947}_1 ∨ -b^{1, 947}_0 ∨ false 
c  in DIMACS:
-4001 -4002 -4003  0

c i = 948
c  -2+1 --> -1
c    ( b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧  p_948) -> ( b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0)
c  in CNF:
c    -b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨  b^{1, 949}_2
c    -b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_1
c    -b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨  b^{1, 949}_0
c  in DIMACS:
-4004 -4005  4006 -948  4007 0
-4004 -4005  4006 -948 -4008 0
-4004 -4005  4006 -948  4009 0

c  -1+1 --> 0
c    ( b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0 ∧  p_948) -> (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧ -b^{1, 949}_0)
c  in CNF:
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_2
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_1
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_0
c  in DIMACS:
-4004  4005 -4006 -948 -4007 0
-4004  4005 -4006 -948 -4008 0
-4004  4005 -4006 -948 -4009 0

c  0+1 --> 1
c    (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧  p_948) -> (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0)
c  in CNF:
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_2
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_1
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨  b^{1, 949}_0
c  in DIMACS:
 4004  4005  4006 -948 -4007 0
 4004  4005  4006 -948 -4008 0
 4004  4005  4006 -948  4009 0

c  1+1 --> 2
c    (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0 ∧  p_948) -> (-b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0)
c  in CNF:
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_2
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨  b^{1, 949}_1
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ -p_948 ∨ -b^{1, 949}_0
c  in DIMACS:
 4004  4005 -4006 -948 -4007 0
 4004  4005 -4006 -948  4008 0
 4004  4005 -4006 -948 -4009 0

c  2+1 --> break 
c    (-b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧  p_948) -> break
c  in CNF:
c     b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 4004 -4005  4006 -948 1162 0


c  2-1 --> 1
c    (-b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧ -p_948) -> (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0)
c  in CNF:
c     b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_2
c     b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_1
c     b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨  b^{1, 949}_0
c  in DIMACS:
 4004 -4005  4006  948 -4007 0
 4004 -4005  4006  948 -4008 0
 4004 -4005  4006  948  4009 0

c  1-1 --> 0
c    (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0 ∧ -p_948) -> (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧ -b^{1, 949}_0)
c  in CNF:
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_2
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_1
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_0
c  in DIMACS:
 4004  4005 -4006  948 -4007 0
 4004  4005 -4006  948 -4008 0
 4004  4005 -4006  948 -4009 0

c  0-1 --> -1
c    (-b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧ -p_948) -> ( b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0)
c  in CNF:
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨  b^{1, 949}_2
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_1
c     b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨  b^{1, 949}_0
c  in DIMACS:
 4004  4005  4006  948  4007 0
 4004  4005  4006  948 -4008 0
 4004  4005  4006  948  4009 0

c  -1-1 --> -2
c    ( b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧  b^{1, 948}_0 ∧ -p_948) -> ( b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0)
c  in CNF:
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨  b^{1, 949}_2
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨  b^{1, 949}_1
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨  p_948 ∨ -b^{1, 949}_0
c  in DIMACS:
-4004  4005 -4006  948  4007 0
-4004  4005 -4006  948  4008 0
-4004  4005 -4006  948 -4009 0

c  -2-1 --> break 
c    ( b^{1, 948}_2 ∧  b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨  b^{1, 948}_0 ∨  p_948 ∨ break
c  in DIMACS:
-4004 -4005  4006  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 948}_2 ∧ -b^{1, 948}_1 ∧ -b^{1, 948}_0 ∧ true) 
c  in CNF:
c    -b^{1, 948}_2 ∨  b^{1, 948}_1 ∨  b^{1, 948}_0 ∨ false 
c  in DIMACS:
-4004  4005  4006  0

c  3 does not represent an automaton state.
c    -(-b^{1, 948}_2 ∧  b^{1, 948}_1 ∧  b^{1, 948}_0 ∧ true) 
c  in CNF:
c     b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ false 
c  in DIMACS:
 4004 -4005 -4006  0
c  -3 does not represent an automaton state.
c    -( b^{1, 948}_2 ∧  b^{1, 948}_1 ∧  b^{1, 948}_0 ∧ true) 
c  in CNF:
c    -b^{1, 948}_2 ∨ -b^{1, 948}_1 ∨ -b^{1, 948}_0 ∨ false 
c  in DIMACS:
-4004 -4005 -4006  0

c i = 949
c  -2+1 --> -1
c    ( b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧  p_949) -> ( b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0)
c  in CNF:
c    -b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨  b^{1, 950}_2
c    -b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_1
c    -b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨  b^{1, 950}_0
c  in DIMACS:
-4007 -4008  4009 -949  4010 0
-4007 -4008  4009 -949 -4011 0
-4007 -4008  4009 -949  4012 0

c  -1+1 --> 0
c    ( b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0 ∧  p_949) -> (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧ -b^{1, 950}_0)
c  in CNF:
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_2
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_1
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_0
c  in DIMACS:
-4007  4008 -4009 -949 -4010 0
-4007  4008 -4009 -949 -4011 0
-4007  4008 -4009 -949 -4012 0

c  0+1 --> 1
c    (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧  p_949) -> (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0)
c  in CNF:
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_2
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_1
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨  b^{1, 950}_0
c  in DIMACS:
 4007  4008  4009 -949 -4010 0
 4007  4008  4009 -949 -4011 0
 4007  4008  4009 -949  4012 0

c  1+1 --> 2
c    (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0 ∧  p_949) -> (-b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0)
c  in CNF:
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_2
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨  b^{1, 950}_1
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ -p_949 ∨ -b^{1, 950}_0
c  in DIMACS:
 4007  4008 -4009 -949 -4010 0
 4007  4008 -4009 -949  4011 0
 4007  4008 -4009 -949 -4012 0

c  2+1 --> break 
c    (-b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧  p_949) -> break
c  in CNF:
c     b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ -p_949 ∨ break
c  in DIMACS:
 4007 -4008  4009 -949 1162 0


c  2-1 --> 1
c    (-b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧ -p_949) -> (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0)
c  in CNF:
c     b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_2
c     b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_1
c     b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨  b^{1, 950}_0
c  in DIMACS:
 4007 -4008  4009  949 -4010 0
 4007 -4008  4009  949 -4011 0
 4007 -4008  4009  949  4012 0

c  1-1 --> 0
c    (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0 ∧ -p_949) -> (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧ -b^{1, 950}_0)
c  in CNF:
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_2
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_1
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_0
c  in DIMACS:
 4007  4008 -4009  949 -4010 0
 4007  4008 -4009  949 -4011 0
 4007  4008 -4009  949 -4012 0

c  0-1 --> -1
c    (-b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧ -p_949) -> ( b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0)
c  in CNF:
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨  b^{1, 950}_2
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_1
c     b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨  b^{1, 950}_0
c  in DIMACS:
 4007  4008  4009  949  4010 0
 4007  4008  4009  949 -4011 0
 4007  4008  4009  949  4012 0

c  -1-1 --> -2
c    ( b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧  b^{1, 949}_0 ∧ -p_949) -> ( b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0)
c  in CNF:
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨  b^{1, 950}_2
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨  b^{1, 950}_1
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨  p_949 ∨ -b^{1, 950}_0
c  in DIMACS:
-4007  4008 -4009  949  4010 0
-4007  4008 -4009  949  4011 0
-4007  4008 -4009  949 -4012 0

c  -2-1 --> break 
c    ( b^{1, 949}_2 ∧  b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧ -p_949) -> break
c  in CNF:
c    -b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨  b^{1, 949}_0 ∨  p_949 ∨ break
c  in DIMACS:
-4007 -4008  4009  949 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 949}_2 ∧ -b^{1, 949}_1 ∧ -b^{1, 949}_0 ∧ true) 
c  in CNF:
c    -b^{1, 949}_2 ∨  b^{1, 949}_1 ∨  b^{1, 949}_0 ∨ false 
c  in DIMACS:
-4007  4008  4009  0

c  3 does not represent an automaton state.
c    -(-b^{1, 949}_2 ∧  b^{1, 949}_1 ∧  b^{1, 949}_0 ∧ true) 
c  in CNF:
c     b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ false 
c  in DIMACS:
 4007 -4008 -4009  0
c  -3 does not represent an automaton state.
c    -( b^{1, 949}_2 ∧  b^{1, 949}_1 ∧  b^{1, 949}_0 ∧ true) 
c  in CNF:
c    -b^{1, 949}_2 ∨ -b^{1, 949}_1 ∨ -b^{1, 949}_0 ∨ false 
c  in DIMACS:
-4007 -4008 -4009  0

c i = 950
c  -2+1 --> -1
c    ( b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧  p_950) -> ( b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0)
c  in CNF:
c    -b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨  b^{1, 951}_2
c    -b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_1
c    -b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨  b^{1, 951}_0
c  in DIMACS:
-4010 -4011  4012 -950  4013 0
-4010 -4011  4012 -950 -4014 0
-4010 -4011  4012 -950  4015 0

c  -1+1 --> 0
c    ( b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0 ∧  p_950) -> (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧ -b^{1, 951}_0)
c  in CNF:
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_2
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_1
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_0
c  in DIMACS:
-4010  4011 -4012 -950 -4013 0
-4010  4011 -4012 -950 -4014 0
-4010  4011 -4012 -950 -4015 0

c  0+1 --> 1
c    (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧  p_950) -> (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0)
c  in CNF:
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_2
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_1
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨  b^{1, 951}_0
c  in DIMACS:
 4010  4011  4012 -950 -4013 0
 4010  4011  4012 -950 -4014 0
 4010  4011  4012 -950  4015 0

c  1+1 --> 2
c    (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0 ∧  p_950) -> (-b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0)
c  in CNF:
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_2
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨  b^{1, 951}_1
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ -p_950 ∨ -b^{1, 951}_0
c  in DIMACS:
 4010  4011 -4012 -950 -4013 0
 4010  4011 -4012 -950  4014 0
 4010  4011 -4012 -950 -4015 0

c  2+1 --> break 
c    (-b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧  p_950) -> break
c  in CNF:
c     b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 4010 -4011  4012 -950 1162 0


c  2-1 --> 1
c    (-b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧ -p_950) -> (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0)
c  in CNF:
c     b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_2
c     b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_1
c     b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨  b^{1, 951}_0
c  in DIMACS:
 4010 -4011  4012  950 -4013 0
 4010 -4011  4012  950 -4014 0
 4010 -4011  4012  950  4015 0

c  1-1 --> 0
c    (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0 ∧ -p_950) -> (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧ -b^{1, 951}_0)
c  in CNF:
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_2
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_1
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_0
c  in DIMACS:
 4010  4011 -4012  950 -4013 0
 4010  4011 -4012  950 -4014 0
 4010  4011 -4012  950 -4015 0

c  0-1 --> -1
c    (-b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧ -p_950) -> ( b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0)
c  in CNF:
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨  b^{1, 951}_2
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_1
c     b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨  b^{1, 951}_0
c  in DIMACS:
 4010  4011  4012  950  4013 0
 4010  4011  4012  950 -4014 0
 4010  4011  4012  950  4015 0

c  -1-1 --> -2
c    ( b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧  b^{1, 950}_0 ∧ -p_950) -> ( b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0)
c  in CNF:
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨  b^{1, 951}_2
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨  b^{1, 951}_1
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨  p_950 ∨ -b^{1, 951}_0
c  in DIMACS:
-4010  4011 -4012  950  4013 0
-4010  4011 -4012  950  4014 0
-4010  4011 -4012  950 -4015 0

c  -2-1 --> break 
c    ( b^{1, 950}_2 ∧  b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨  b^{1, 950}_0 ∨  p_950 ∨ break
c  in DIMACS:
-4010 -4011  4012  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 950}_2 ∧ -b^{1, 950}_1 ∧ -b^{1, 950}_0 ∧ true) 
c  in CNF:
c    -b^{1, 950}_2 ∨  b^{1, 950}_1 ∨  b^{1, 950}_0 ∨ false 
c  in DIMACS:
-4010  4011  4012  0

c  3 does not represent an automaton state.
c    -(-b^{1, 950}_2 ∧  b^{1, 950}_1 ∧  b^{1, 950}_0 ∧ true) 
c  in CNF:
c     b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ false 
c  in DIMACS:
 4010 -4011 -4012  0
c  -3 does not represent an automaton state.
c    -( b^{1, 950}_2 ∧  b^{1, 950}_1 ∧  b^{1, 950}_0 ∧ true) 
c  in CNF:
c    -b^{1, 950}_2 ∨ -b^{1, 950}_1 ∨ -b^{1, 950}_0 ∨ false 
c  in DIMACS:
-4010 -4011 -4012  0

c i = 951
c  -2+1 --> -1
c    ( b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧  p_951) -> ( b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0)
c  in CNF:
c    -b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨  b^{1, 952}_2
c    -b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_1
c    -b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨  b^{1, 952}_0
c  in DIMACS:
-4013 -4014  4015 -951  4016 0
-4013 -4014  4015 -951 -4017 0
-4013 -4014  4015 -951  4018 0

c  -1+1 --> 0
c    ( b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0 ∧  p_951) -> (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧ -b^{1, 952}_0)
c  in CNF:
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_2
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_1
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_0
c  in DIMACS:
-4013  4014 -4015 -951 -4016 0
-4013  4014 -4015 -951 -4017 0
-4013  4014 -4015 -951 -4018 0

c  0+1 --> 1
c    (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧  p_951) -> (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0)
c  in CNF:
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_2
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_1
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨  b^{1, 952}_0
c  in DIMACS:
 4013  4014  4015 -951 -4016 0
 4013  4014  4015 -951 -4017 0
 4013  4014  4015 -951  4018 0

c  1+1 --> 2
c    (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0 ∧  p_951) -> (-b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0)
c  in CNF:
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_2
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨  b^{1, 952}_1
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ -p_951 ∨ -b^{1, 952}_0
c  in DIMACS:
 4013  4014 -4015 -951 -4016 0
 4013  4014 -4015 -951  4017 0
 4013  4014 -4015 -951 -4018 0

c  2+1 --> break 
c    (-b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧  p_951) -> break
c  in CNF:
c     b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ -p_951 ∨ break
c  in DIMACS:
 4013 -4014  4015 -951 1162 0


c  2-1 --> 1
c    (-b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧ -p_951) -> (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0)
c  in CNF:
c     b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_2
c     b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_1
c     b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨  b^{1, 952}_0
c  in DIMACS:
 4013 -4014  4015  951 -4016 0
 4013 -4014  4015  951 -4017 0
 4013 -4014  4015  951  4018 0

c  1-1 --> 0
c    (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0 ∧ -p_951) -> (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧ -b^{1, 952}_0)
c  in CNF:
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_2
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_1
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_0
c  in DIMACS:
 4013  4014 -4015  951 -4016 0
 4013  4014 -4015  951 -4017 0
 4013  4014 -4015  951 -4018 0

c  0-1 --> -1
c    (-b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧ -p_951) -> ( b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0)
c  in CNF:
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨  b^{1, 952}_2
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_1
c     b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨  b^{1, 952}_0
c  in DIMACS:
 4013  4014  4015  951  4016 0
 4013  4014  4015  951 -4017 0
 4013  4014  4015  951  4018 0

c  -1-1 --> -2
c    ( b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧  b^{1, 951}_0 ∧ -p_951) -> ( b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0)
c  in CNF:
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨  b^{1, 952}_2
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨  b^{1, 952}_1
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨  p_951 ∨ -b^{1, 952}_0
c  in DIMACS:
-4013  4014 -4015  951  4016 0
-4013  4014 -4015  951  4017 0
-4013  4014 -4015  951 -4018 0

c  -2-1 --> break 
c    ( b^{1, 951}_2 ∧  b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧ -p_951) -> break
c  in CNF:
c    -b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨  b^{1, 951}_0 ∨  p_951 ∨ break
c  in DIMACS:
-4013 -4014  4015  951 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 951}_2 ∧ -b^{1, 951}_1 ∧ -b^{1, 951}_0 ∧ true) 
c  in CNF:
c    -b^{1, 951}_2 ∨  b^{1, 951}_1 ∨  b^{1, 951}_0 ∨ false 
c  in DIMACS:
-4013  4014  4015  0

c  3 does not represent an automaton state.
c    -(-b^{1, 951}_2 ∧  b^{1, 951}_1 ∧  b^{1, 951}_0 ∧ true) 
c  in CNF:
c     b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ false 
c  in DIMACS:
 4013 -4014 -4015  0
c  -3 does not represent an automaton state.
c    -( b^{1, 951}_2 ∧  b^{1, 951}_1 ∧  b^{1, 951}_0 ∧ true) 
c  in CNF:
c    -b^{1, 951}_2 ∨ -b^{1, 951}_1 ∨ -b^{1, 951}_0 ∨ false 
c  in DIMACS:
-4013 -4014 -4015  0

c i = 952
c  -2+1 --> -1
c    ( b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧  p_952) -> ( b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0)
c  in CNF:
c    -b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨  b^{1, 953}_2
c    -b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_1
c    -b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨  b^{1, 953}_0
c  in DIMACS:
-4016 -4017  4018 -952  4019 0
-4016 -4017  4018 -952 -4020 0
-4016 -4017  4018 -952  4021 0

c  -1+1 --> 0
c    ( b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0 ∧  p_952) -> (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧ -b^{1, 953}_0)
c  in CNF:
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_2
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_1
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_0
c  in DIMACS:
-4016  4017 -4018 -952 -4019 0
-4016  4017 -4018 -952 -4020 0
-4016  4017 -4018 -952 -4021 0

c  0+1 --> 1
c    (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧  p_952) -> (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0)
c  in CNF:
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_2
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_1
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨  b^{1, 953}_0
c  in DIMACS:
 4016  4017  4018 -952 -4019 0
 4016  4017  4018 -952 -4020 0
 4016  4017  4018 -952  4021 0

c  1+1 --> 2
c    (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0 ∧  p_952) -> (-b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0)
c  in CNF:
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_2
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨  b^{1, 953}_1
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ -p_952 ∨ -b^{1, 953}_0
c  in DIMACS:
 4016  4017 -4018 -952 -4019 0
 4016  4017 -4018 -952  4020 0
 4016  4017 -4018 -952 -4021 0

c  2+1 --> break 
c    (-b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧  p_952) -> break
c  in CNF:
c     b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 4016 -4017  4018 -952 1162 0


c  2-1 --> 1
c    (-b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧ -p_952) -> (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0)
c  in CNF:
c     b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_2
c     b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_1
c     b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨  b^{1, 953}_0
c  in DIMACS:
 4016 -4017  4018  952 -4019 0
 4016 -4017  4018  952 -4020 0
 4016 -4017  4018  952  4021 0

c  1-1 --> 0
c    (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0 ∧ -p_952) -> (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧ -b^{1, 953}_0)
c  in CNF:
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_2
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_1
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_0
c  in DIMACS:
 4016  4017 -4018  952 -4019 0
 4016  4017 -4018  952 -4020 0
 4016  4017 -4018  952 -4021 0

c  0-1 --> -1
c    (-b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧ -p_952) -> ( b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0)
c  in CNF:
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨  b^{1, 953}_2
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_1
c     b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨  b^{1, 953}_0
c  in DIMACS:
 4016  4017  4018  952  4019 0
 4016  4017  4018  952 -4020 0
 4016  4017  4018  952  4021 0

c  -1-1 --> -2
c    ( b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧  b^{1, 952}_0 ∧ -p_952) -> ( b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0)
c  in CNF:
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨  b^{1, 953}_2
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨  b^{1, 953}_1
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨  p_952 ∨ -b^{1, 953}_0
c  in DIMACS:
-4016  4017 -4018  952  4019 0
-4016  4017 -4018  952  4020 0
-4016  4017 -4018  952 -4021 0

c  -2-1 --> break 
c    ( b^{1, 952}_2 ∧  b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨  b^{1, 952}_0 ∨  p_952 ∨ break
c  in DIMACS:
-4016 -4017  4018  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 952}_2 ∧ -b^{1, 952}_1 ∧ -b^{1, 952}_0 ∧ true) 
c  in CNF:
c    -b^{1, 952}_2 ∨  b^{1, 952}_1 ∨  b^{1, 952}_0 ∨ false 
c  in DIMACS:
-4016  4017  4018  0

c  3 does not represent an automaton state.
c    -(-b^{1, 952}_2 ∧  b^{1, 952}_1 ∧  b^{1, 952}_0 ∧ true) 
c  in CNF:
c     b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ false 
c  in DIMACS:
 4016 -4017 -4018  0
c  -3 does not represent an automaton state.
c    -( b^{1, 952}_2 ∧  b^{1, 952}_1 ∧  b^{1, 952}_0 ∧ true) 
c  in CNF:
c    -b^{1, 952}_2 ∨ -b^{1, 952}_1 ∨ -b^{1, 952}_0 ∨ false 
c  in DIMACS:
-4016 -4017 -4018  0

c i = 953
c  -2+1 --> -1
c    ( b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧  p_953) -> ( b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0)
c  in CNF:
c    -b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨  b^{1, 954}_2
c    -b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_1
c    -b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨  b^{1, 954}_0
c  in DIMACS:
-4019 -4020  4021 -953  4022 0
-4019 -4020  4021 -953 -4023 0
-4019 -4020  4021 -953  4024 0

c  -1+1 --> 0
c    ( b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0 ∧  p_953) -> (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧ -b^{1, 954}_0)
c  in CNF:
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_2
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_1
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_0
c  in DIMACS:
-4019  4020 -4021 -953 -4022 0
-4019  4020 -4021 -953 -4023 0
-4019  4020 -4021 -953 -4024 0

c  0+1 --> 1
c    (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧  p_953) -> (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0)
c  in CNF:
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_2
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_1
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨  b^{1, 954}_0
c  in DIMACS:
 4019  4020  4021 -953 -4022 0
 4019  4020  4021 -953 -4023 0
 4019  4020  4021 -953  4024 0

c  1+1 --> 2
c    (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0 ∧  p_953) -> (-b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0)
c  in CNF:
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_2
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨  b^{1, 954}_1
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ -p_953 ∨ -b^{1, 954}_0
c  in DIMACS:
 4019  4020 -4021 -953 -4022 0
 4019  4020 -4021 -953  4023 0
 4019  4020 -4021 -953 -4024 0

c  2+1 --> break 
c    (-b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧  p_953) -> break
c  in CNF:
c     b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ -p_953 ∨ break
c  in DIMACS:
 4019 -4020  4021 -953 1162 0


c  2-1 --> 1
c    (-b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧ -p_953) -> (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0)
c  in CNF:
c     b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_2
c     b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_1
c     b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨  b^{1, 954}_0
c  in DIMACS:
 4019 -4020  4021  953 -4022 0
 4019 -4020  4021  953 -4023 0
 4019 -4020  4021  953  4024 0

c  1-1 --> 0
c    (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0 ∧ -p_953) -> (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧ -b^{1, 954}_0)
c  in CNF:
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_2
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_1
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_0
c  in DIMACS:
 4019  4020 -4021  953 -4022 0
 4019  4020 -4021  953 -4023 0
 4019  4020 -4021  953 -4024 0

c  0-1 --> -1
c    (-b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧ -p_953) -> ( b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0)
c  in CNF:
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨  b^{1, 954}_2
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_1
c     b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨  b^{1, 954}_0
c  in DIMACS:
 4019  4020  4021  953  4022 0
 4019  4020  4021  953 -4023 0
 4019  4020  4021  953  4024 0

c  -1-1 --> -2
c    ( b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧  b^{1, 953}_0 ∧ -p_953) -> ( b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0)
c  in CNF:
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨  b^{1, 954}_2
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨  b^{1, 954}_1
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨  p_953 ∨ -b^{1, 954}_0
c  in DIMACS:
-4019  4020 -4021  953  4022 0
-4019  4020 -4021  953  4023 0
-4019  4020 -4021  953 -4024 0

c  -2-1 --> break 
c    ( b^{1, 953}_2 ∧  b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧ -p_953) -> break
c  in CNF:
c    -b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨  b^{1, 953}_0 ∨  p_953 ∨ break
c  in DIMACS:
-4019 -4020  4021  953 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 953}_2 ∧ -b^{1, 953}_1 ∧ -b^{1, 953}_0 ∧ true) 
c  in CNF:
c    -b^{1, 953}_2 ∨  b^{1, 953}_1 ∨  b^{1, 953}_0 ∨ false 
c  in DIMACS:
-4019  4020  4021  0

c  3 does not represent an automaton state.
c    -(-b^{1, 953}_2 ∧  b^{1, 953}_1 ∧  b^{1, 953}_0 ∧ true) 
c  in CNF:
c     b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ false 
c  in DIMACS:
 4019 -4020 -4021  0
c  -3 does not represent an automaton state.
c    -( b^{1, 953}_2 ∧  b^{1, 953}_1 ∧  b^{1, 953}_0 ∧ true) 
c  in CNF:
c    -b^{1, 953}_2 ∨ -b^{1, 953}_1 ∨ -b^{1, 953}_0 ∨ false 
c  in DIMACS:
-4019 -4020 -4021  0

c i = 954
c  -2+1 --> -1
c    ( b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧  p_954) -> ( b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0)
c  in CNF:
c    -b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨  b^{1, 955}_2
c    -b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_1
c    -b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨  b^{1, 955}_0
c  in DIMACS:
-4022 -4023  4024 -954  4025 0
-4022 -4023  4024 -954 -4026 0
-4022 -4023  4024 -954  4027 0

c  -1+1 --> 0
c    ( b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0 ∧  p_954) -> (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧ -b^{1, 955}_0)
c  in CNF:
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_2
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_1
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_0
c  in DIMACS:
-4022  4023 -4024 -954 -4025 0
-4022  4023 -4024 -954 -4026 0
-4022  4023 -4024 -954 -4027 0

c  0+1 --> 1
c    (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧  p_954) -> (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0)
c  in CNF:
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_2
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_1
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨  b^{1, 955}_0
c  in DIMACS:
 4022  4023  4024 -954 -4025 0
 4022  4023  4024 -954 -4026 0
 4022  4023  4024 -954  4027 0

c  1+1 --> 2
c    (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0 ∧  p_954) -> (-b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0)
c  in CNF:
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_2
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨  b^{1, 955}_1
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ -p_954 ∨ -b^{1, 955}_0
c  in DIMACS:
 4022  4023 -4024 -954 -4025 0
 4022  4023 -4024 -954  4026 0
 4022  4023 -4024 -954 -4027 0

c  2+1 --> break 
c    (-b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧  p_954) -> break
c  in CNF:
c     b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 4022 -4023  4024 -954 1162 0


c  2-1 --> 1
c    (-b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧ -p_954) -> (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0)
c  in CNF:
c     b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_2
c     b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_1
c     b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨  b^{1, 955}_0
c  in DIMACS:
 4022 -4023  4024  954 -4025 0
 4022 -4023  4024  954 -4026 0
 4022 -4023  4024  954  4027 0

c  1-1 --> 0
c    (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0 ∧ -p_954) -> (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧ -b^{1, 955}_0)
c  in CNF:
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_2
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_1
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_0
c  in DIMACS:
 4022  4023 -4024  954 -4025 0
 4022  4023 -4024  954 -4026 0
 4022  4023 -4024  954 -4027 0

c  0-1 --> -1
c    (-b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧ -p_954) -> ( b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0)
c  in CNF:
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨  b^{1, 955}_2
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_1
c     b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨  b^{1, 955}_0
c  in DIMACS:
 4022  4023  4024  954  4025 0
 4022  4023  4024  954 -4026 0
 4022  4023  4024  954  4027 0

c  -1-1 --> -2
c    ( b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧  b^{1, 954}_0 ∧ -p_954) -> ( b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0)
c  in CNF:
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨  b^{1, 955}_2
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨  b^{1, 955}_1
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨  p_954 ∨ -b^{1, 955}_0
c  in DIMACS:
-4022  4023 -4024  954  4025 0
-4022  4023 -4024  954  4026 0
-4022  4023 -4024  954 -4027 0

c  -2-1 --> break 
c    ( b^{1, 954}_2 ∧  b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨  b^{1, 954}_0 ∨  p_954 ∨ break
c  in DIMACS:
-4022 -4023  4024  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 954}_2 ∧ -b^{1, 954}_1 ∧ -b^{1, 954}_0 ∧ true) 
c  in CNF:
c    -b^{1, 954}_2 ∨  b^{1, 954}_1 ∨  b^{1, 954}_0 ∨ false 
c  in DIMACS:
-4022  4023  4024  0

c  3 does not represent an automaton state.
c    -(-b^{1, 954}_2 ∧  b^{1, 954}_1 ∧  b^{1, 954}_0 ∧ true) 
c  in CNF:
c     b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ false 
c  in DIMACS:
 4022 -4023 -4024  0
c  -3 does not represent an automaton state.
c    -( b^{1, 954}_2 ∧  b^{1, 954}_1 ∧  b^{1, 954}_0 ∧ true) 
c  in CNF:
c    -b^{1, 954}_2 ∨ -b^{1, 954}_1 ∨ -b^{1, 954}_0 ∨ false 
c  in DIMACS:
-4022 -4023 -4024  0

c i = 955
c  -2+1 --> -1
c    ( b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧  p_955) -> ( b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0)
c  in CNF:
c    -b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨  b^{1, 956}_2
c    -b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_1
c    -b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨  b^{1, 956}_0
c  in DIMACS:
-4025 -4026  4027 -955  4028 0
-4025 -4026  4027 -955 -4029 0
-4025 -4026  4027 -955  4030 0

c  -1+1 --> 0
c    ( b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0 ∧  p_955) -> (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧ -b^{1, 956}_0)
c  in CNF:
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_2
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_1
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_0
c  in DIMACS:
-4025  4026 -4027 -955 -4028 0
-4025  4026 -4027 -955 -4029 0
-4025  4026 -4027 -955 -4030 0

c  0+1 --> 1
c    (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧  p_955) -> (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0)
c  in CNF:
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_2
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_1
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨  b^{1, 956}_0
c  in DIMACS:
 4025  4026  4027 -955 -4028 0
 4025  4026  4027 -955 -4029 0
 4025  4026  4027 -955  4030 0

c  1+1 --> 2
c    (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0 ∧  p_955) -> (-b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0)
c  in CNF:
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_2
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨  b^{1, 956}_1
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ -p_955 ∨ -b^{1, 956}_0
c  in DIMACS:
 4025  4026 -4027 -955 -4028 0
 4025  4026 -4027 -955  4029 0
 4025  4026 -4027 -955 -4030 0

c  2+1 --> break 
c    (-b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧  p_955) -> break
c  in CNF:
c     b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ -p_955 ∨ break
c  in DIMACS:
 4025 -4026  4027 -955 1162 0


c  2-1 --> 1
c    (-b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧ -p_955) -> (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0)
c  in CNF:
c     b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_2
c     b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_1
c     b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨  b^{1, 956}_0
c  in DIMACS:
 4025 -4026  4027  955 -4028 0
 4025 -4026  4027  955 -4029 0
 4025 -4026  4027  955  4030 0

c  1-1 --> 0
c    (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0 ∧ -p_955) -> (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧ -b^{1, 956}_0)
c  in CNF:
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_2
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_1
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_0
c  in DIMACS:
 4025  4026 -4027  955 -4028 0
 4025  4026 -4027  955 -4029 0
 4025  4026 -4027  955 -4030 0

c  0-1 --> -1
c    (-b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧ -p_955) -> ( b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0)
c  in CNF:
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨  b^{1, 956}_2
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_1
c     b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨  b^{1, 956}_0
c  in DIMACS:
 4025  4026  4027  955  4028 0
 4025  4026  4027  955 -4029 0
 4025  4026  4027  955  4030 0

c  -1-1 --> -2
c    ( b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧  b^{1, 955}_0 ∧ -p_955) -> ( b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0)
c  in CNF:
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨  b^{1, 956}_2
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨  b^{1, 956}_1
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨  p_955 ∨ -b^{1, 956}_0
c  in DIMACS:
-4025  4026 -4027  955  4028 0
-4025  4026 -4027  955  4029 0
-4025  4026 -4027  955 -4030 0

c  -2-1 --> break 
c    ( b^{1, 955}_2 ∧  b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧ -p_955) -> break
c  in CNF:
c    -b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨  b^{1, 955}_0 ∨  p_955 ∨ break
c  in DIMACS:
-4025 -4026  4027  955 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 955}_2 ∧ -b^{1, 955}_1 ∧ -b^{1, 955}_0 ∧ true) 
c  in CNF:
c    -b^{1, 955}_2 ∨  b^{1, 955}_1 ∨  b^{1, 955}_0 ∨ false 
c  in DIMACS:
-4025  4026  4027  0

c  3 does not represent an automaton state.
c    -(-b^{1, 955}_2 ∧  b^{1, 955}_1 ∧  b^{1, 955}_0 ∧ true) 
c  in CNF:
c     b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ false 
c  in DIMACS:
 4025 -4026 -4027  0
c  -3 does not represent an automaton state.
c    -( b^{1, 955}_2 ∧  b^{1, 955}_1 ∧  b^{1, 955}_0 ∧ true) 
c  in CNF:
c    -b^{1, 955}_2 ∨ -b^{1, 955}_1 ∨ -b^{1, 955}_0 ∨ false 
c  in DIMACS:
-4025 -4026 -4027  0

c i = 956
c  -2+1 --> -1
c    ( b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧  p_956) -> ( b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0)
c  in CNF:
c    -b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨  b^{1, 957}_2
c    -b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_1
c    -b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨  b^{1, 957}_0
c  in DIMACS:
-4028 -4029  4030 -956  4031 0
-4028 -4029  4030 -956 -4032 0
-4028 -4029  4030 -956  4033 0

c  -1+1 --> 0
c    ( b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0 ∧  p_956) -> (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧ -b^{1, 957}_0)
c  in CNF:
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_2
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_1
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_0
c  in DIMACS:
-4028  4029 -4030 -956 -4031 0
-4028  4029 -4030 -956 -4032 0
-4028  4029 -4030 -956 -4033 0

c  0+1 --> 1
c    (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧  p_956) -> (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0)
c  in CNF:
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_2
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_1
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨  b^{1, 957}_0
c  in DIMACS:
 4028  4029  4030 -956 -4031 0
 4028  4029  4030 -956 -4032 0
 4028  4029  4030 -956  4033 0

c  1+1 --> 2
c    (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0 ∧  p_956) -> (-b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0)
c  in CNF:
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_2
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨  b^{1, 957}_1
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ -p_956 ∨ -b^{1, 957}_0
c  in DIMACS:
 4028  4029 -4030 -956 -4031 0
 4028  4029 -4030 -956  4032 0
 4028  4029 -4030 -956 -4033 0

c  2+1 --> break 
c    (-b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧  p_956) -> break
c  in CNF:
c     b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ -p_956 ∨ break
c  in DIMACS:
 4028 -4029  4030 -956 1162 0


c  2-1 --> 1
c    (-b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧ -p_956) -> (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0)
c  in CNF:
c     b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_2
c     b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_1
c     b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨  b^{1, 957}_0
c  in DIMACS:
 4028 -4029  4030  956 -4031 0
 4028 -4029  4030  956 -4032 0
 4028 -4029  4030  956  4033 0

c  1-1 --> 0
c    (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0 ∧ -p_956) -> (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧ -b^{1, 957}_0)
c  in CNF:
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_2
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_1
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_0
c  in DIMACS:
 4028  4029 -4030  956 -4031 0
 4028  4029 -4030  956 -4032 0
 4028  4029 -4030  956 -4033 0

c  0-1 --> -1
c    (-b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧ -p_956) -> ( b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0)
c  in CNF:
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨  b^{1, 957}_2
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_1
c     b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨  b^{1, 957}_0
c  in DIMACS:
 4028  4029  4030  956  4031 0
 4028  4029  4030  956 -4032 0
 4028  4029  4030  956  4033 0

c  -1-1 --> -2
c    ( b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧  b^{1, 956}_0 ∧ -p_956) -> ( b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0)
c  in CNF:
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨  b^{1, 957}_2
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨  b^{1, 957}_1
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨  p_956 ∨ -b^{1, 957}_0
c  in DIMACS:
-4028  4029 -4030  956  4031 0
-4028  4029 -4030  956  4032 0
-4028  4029 -4030  956 -4033 0

c  -2-1 --> break 
c    ( b^{1, 956}_2 ∧  b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧ -p_956) -> break
c  in CNF:
c    -b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨  b^{1, 956}_0 ∨  p_956 ∨ break
c  in DIMACS:
-4028 -4029  4030  956 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 956}_2 ∧ -b^{1, 956}_1 ∧ -b^{1, 956}_0 ∧ true) 
c  in CNF:
c    -b^{1, 956}_2 ∨  b^{1, 956}_1 ∨  b^{1, 956}_0 ∨ false 
c  in DIMACS:
-4028  4029  4030  0

c  3 does not represent an automaton state.
c    -(-b^{1, 956}_2 ∧  b^{1, 956}_1 ∧  b^{1, 956}_0 ∧ true) 
c  in CNF:
c     b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ false 
c  in DIMACS:
 4028 -4029 -4030  0
c  -3 does not represent an automaton state.
c    -( b^{1, 956}_2 ∧  b^{1, 956}_1 ∧  b^{1, 956}_0 ∧ true) 
c  in CNF:
c    -b^{1, 956}_2 ∨ -b^{1, 956}_1 ∨ -b^{1, 956}_0 ∨ false 
c  in DIMACS:
-4028 -4029 -4030  0

c i = 957
c  -2+1 --> -1
c    ( b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧  p_957) -> ( b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0)
c  in CNF:
c    -b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨  b^{1, 958}_2
c    -b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_1
c    -b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨  b^{1, 958}_0
c  in DIMACS:
-4031 -4032  4033 -957  4034 0
-4031 -4032  4033 -957 -4035 0
-4031 -4032  4033 -957  4036 0

c  -1+1 --> 0
c    ( b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0 ∧  p_957) -> (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧ -b^{1, 958}_0)
c  in CNF:
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_2
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_1
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_0
c  in DIMACS:
-4031  4032 -4033 -957 -4034 0
-4031  4032 -4033 -957 -4035 0
-4031  4032 -4033 -957 -4036 0

c  0+1 --> 1
c    (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧  p_957) -> (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0)
c  in CNF:
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_2
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_1
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨  b^{1, 958}_0
c  in DIMACS:
 4031  4032  4033 -957 -4034 0
 4031  4032  4033 -957 -4035 0
 4031  4032  4033 -957  4036 0

c  1+1 --> 2
c    (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0 ∧  p_957) -> (-b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0)
c  in CNF:
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_2
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨  b^{1, 958}_1
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ -p_957 ∨ -b^{1, 958}_0
c  in DIMACS:
 4031  4032 -4033 -957 -4034 0
 4031  4032 -4033 -957  4035 0
 4031  4032 -4033 -957 -4036 0

c  2+1 --> break 
c    (-b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧  p_957) -> break
c  in CNF:
c     b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 4031 -4032  4033 -957 1162 0


c  2-1 --> 1
c    (-b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧ -p_957) -> (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0)
c  in CNF:
c     b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_2
c     b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_1
c     b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨  b^{1, 958}_0
c  in DIMACS:
 4031 -4032  4033  957 -4034 0
 4031 -4032  4033  957 -4035 0
 4031 -4032  4033  957  4036 0

c  1-1 --> 0
c    (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0 ∧ -p_957) -> (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧ -b^{1, 958}_0)
c  in CNF:
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_2
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_1
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_0
c  in DIMACS:
 4031  4032 -4033  957 -4034 0
 4031  4032 -4033  957 -4035 0
 4031  4032 -4033  957 -4036 0

c  0-1 --> -1
c    (-b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧ -p_957) -> ( b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0)
c  in CNF:
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨  b^{1, 958}_2
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_1
c     b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨  b^{1, 958}_0
c  in DIMACS:
 4031  4032  4033  957  4034 0
 4031  4032  4033  957 -4035 0
 4031  4032  4033  957  4036 0

c  -1-1 --> -2
c    ( b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧  b^{1, 957}_0 ∧ -p_957) -> ( b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0)
c  in CNF:
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨  b^{1, 958}_2
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨  b^{1, 958}_1
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨  p_957 ∨ -b^{1, 958}_0
c  in DIMACS:
-4031  4032 -4033  957  4034 0
-4031  4032 -4033  957  4035 0
-4031  4032 -4033  957 -4036 0

c  -2-1 --> break 
c    ( b^{1, 957}_2 ∧  b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨  b^{1, 957}_0 ∨  p_957 ∨ break
c  in DIMACS:
-4031 -4032  4033  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 957}_2 ∧ -b^{1, 957}_1 ∧ -b^{1, 957}_0 ∧ true) 
c  in CNF:
c    -b^{1, 957}_2 ∨  b^{1, 957}_1 ∨  b^{1, 957}_0 ∨ false 
c  in DIMACS:
-4031  4032  4033  0

c  3 does not represent an automaton state.
c    -(-b^{1, 957}_2 ∧  b^{1, 957}_1 ∧  b^{1, 957}_0 ∧ true) 
c  in CNF:
c     b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ false 
c  in DIMACS:
 4031 -4032 -4033  0
c  -3 does not represent an automaton state.
c    -( b^{1, 957}_2 ∧  b^{1, 957}_1 ∧  b^{1, 957}_0 ∧ true) 
c  in CNF:
c    -b^{1, 957}_2 ∨ -b^{1, 957}_1 ∨ -b^{1, 957}_0 ∨ false 
c  in DIMACS:
-4031 -4032 -4033  0

c i = 958
c  -2+1 --> -1
c    ( b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧  p_958) -> ( b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0)
c  in CNF:
c    -b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨  b^{1, 959}_2
c    -b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_1
c    -b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨  b^{1, 959}_0
c  in DIMACS:
-4034 -4035  4036 -958  4037 0
-4034 -4035  4036 -958 -4038 0
-4034 -4035  4036 -958  4039 0

c  -1+1 --> 0
c    ( b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0 ∧  p_958) -> (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧ -b^{1, 959}_0)
c  in CNF:
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_2
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_1
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_0
c  in DIMACS:
-4034  4035 -4036 -958 -4037 0
-4034  4035 -4036 -958 -4038 0
-4034  4035 -4036 -958 -4039 0

c  0+1 --> 1
c    (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧  p_958) -> (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0)
c  in CNF:
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_2
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_1
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨  b^{1, 959}_0
c  in DIMACS:
 4034  4035  4036 -958 -4037 0
 4034  4035  4036 -958 -4038 0
 4034  4035  4036 -958  4039 0

c  1+1 --> 2
c    (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0 ∧  p_958) -> (-b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0)
c  in CNF:
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_2
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨  b^{1, 959}_1
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ -p_958 ∨ -b^{1, 959}_0
c  in DIMACS:
 4034  4035 -4036 -958 -4037 0
 4034  4035 -4036 -958  4038 0
 4034  4035 -4036 -958 -4039 0

c  2+1 --> break 
c    (-b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧  p_958) -> break
c  in CNF:
c     b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ -p_958 ∨ break
c  in DIMACS:
 4034 -4035  4036 -958 1162 0


c  2-1 --> 1
c    (-b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧ -p_958) -> (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0)
c  in CNF:
c     b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_2
c     b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_1
c     b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨  b^{1, 959}_0
c  in DIMACS:
 4034 -4035  4036  958 -4037 0
 4034 -4035  4036  958 -4038 0
 4034 -4035  4036  958  4039 0

c  1-1 --> 0
c    (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0 ∧ -p_958) -> (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧ -b^{1, 959}_0)
c  in CNF:
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_2
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_1
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_0
c  in DIMACS:
 4034  4035 -4036  958 -4037 0
 4034  4035 -4036  958 -4038 0
 4034  4035 -4036  958 -4039 0

c  0-1 --> -1
c    (-b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧ -p_958) -> ( b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0)
c  in CNF:
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨  b^{1, 959}_2
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_1
c     b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨  b^{1, 959}_0
c  in DIMACS:
 4034  4035  4036  958  4037 0
 4034  4035  4036  958 -4038 0
 4034  4035  4036  958  4039 0

c  -1-1 --> -2
c    ( b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧  b^{1, 958}_0 ∧ -p_958) -> ( b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0)
c  in CNF:
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨  b^{1, 959}_2
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨  b^{1, 959}_1
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨  p_958 ∨ -b^{1, 959}_0
c  in DIMACS:
-4034  4035 -4036  958  4037 0
-4034  4035 -4036  958  4038 0
-4034  4035 -4036  958 -4039 0

c  -2-1 --> break 
c    ( b^{1, 958}_2 ∧  b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧ -p_958) -> break
c  in CNF:
c    -b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨  b^{1, 958}_0 ∨  p_958 ∨ break
c  in DIMACS:
-4034 -4035  4036  958 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 958}_2 ∧ -b^{1, 958}_1 ∧ -b^{1, 958}_0 ∧ true) 
c  in CNF:
c    -b^{1, 958}_2 ∨  b^{1, 958}_1 ∨  b^{1, 958}_0 ∨ false 
c  in DIMACS:
-4034  4035  4036  0

c  3 does not represent an automaton state.
c    -(-b^{1, 958}_2 ∧  b^{1, 958}_1 ∧  b^{1, 958}_0 ∧ true) 
c  in CNF:
c     b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ false 
c  in DIMACS:
 4034 -4035 -4036  0
c  -3 does not represent an automaton state.
c    -( b^{1, 958}_2 ∧  b^{1, 958}_1 ∧  b^{1, 958}_0 ∧ true) 
c  in CNF:
c    -b^{1, 958}_2 ∨ -b^{1, 958}_1 ∨ -b^{1, 958}_0 ∨ false 
c  in DIMACS:
-4034 -4035 -4036  0

c i = 959
c  -2+1 --> -1
c    ( b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧  p_959) -> ( b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0)
c  in CNF:
c    -b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨  b^{1, 960}_2
c    -b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_1
c    -b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨  b^{1, 960}_0
c  in DIMACS:
-4037 -4038  4039 -959  4040 0
-4037 -4038  4039 -959 -4041 0
-4037 -4038  4039 -959  4042 0

c  -1+1 --> 0
c    ( b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0 ∧  p_959) -> (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧ -b^{1, 960}_0)
c  in CNF:
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_2
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_1
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_0
c  in DIMACS:
-4037  4038 -4039 -959 -4040 0
-4037  4038 -4039 -959 -4041 0
-4037  4038 -4039 -959 -4042 0

c  0+1 --> 1
c    (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧  p_959) -> (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0)
c  in CNF:
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_2
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_1
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨  b^{1, 960}_0
c  in DIMACS:
 4037  4038  4039 -959 -4040 0
 4037  4038  4039 -959 -4041 0
 4037  4038  4039 -959  4042 0

c  1+1 --> 2
c    (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0 ∧  p_959) -> (-b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0)
c  in CNF:
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_2
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨  b^{1, 960}_1
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ -p_959 ∨ -b^{1, 960}_0
c  in DIMACS:
 4037  4038 -4039 -959 -4040 0
 4037  4038 -4039 -959  4041 0
 4037  4038 -4039 -959 -4042 0

c  2+1 --> break 
c    (-b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧  p_959) -> break
c  in CNF:
c     b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ -p_959 ∨ break
c  in DIMACS:
 4037 -4038  4039 -959 1162 0


c  2-1 --> 1
c    (-b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧ -p_959) -> (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0)
c  in CNF:
c     b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_2
c     b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_1
c     b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨  b^{1, 960}_0
c  in DIMACS:
 4037 -4038  4039  959 -4040 0
 4037 -4038  4039  959 -4041 0
 4037 -4038  4039  959  4042 0

c  1-1 --> 0
c    (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0 ∧ -p_959) -> (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧ -b^{1, 960}_0)
c  in CNF:
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_2
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_1
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_0
c  in DIMACS:
 4037  4038 -4039  959 -4040 0
 4037  4038 -4039  959 -4041 0
 4037  4038 -4039  959 -4042 0

c  0-1 --> -1
c    (-b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧ -p_959) -> ( b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0)
c  in CNF:
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨  b^{1, 960}_2
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_1
c     b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨  b^{1, 960}_0
c  in DIMACS:
 4037  4038  4039  959  4040 0
 4037  4038  4039  959 -4041 0
 4037  4038  4039  959  4042 0

c  -1-1 --> -2
c    ( b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧  b^{1, 959}_0 ∧ -p_959) -> ( b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0)
c  in CNF:
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨  b^{1, 960}_2
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨  b^{1, 960}_1
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨  p_959 ∨ -b^{1, 960}_0
c  in DIMACS:
-4037  4038 -4039  959  4040 0
-4037  4038 -4039  959  4041 0
-4037  4038 -4039  959 -4042 0

c  -2-1 --> break 
c    ( b^{1, 959}_2 ∧  b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧ -p_959) -> break
c  in CNF:
c    -b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨  b^{1, 959}_0 ∨  p_959 ∨ break
c  in DIMACS:
-4037 -4038  4039  959 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 959}_2 ∧ -b^{1, 959}_1 ∧ -b^{1, 959}_0 ∧ true) 
c  in CNF:
c    -b^{1, 959}_2 ∨  b^{1, 959}_1 ∨  b^{1, 959}_0 ∨ false 
c  in DIMACS:
-4037  4038  4039  0

c  3 does not represent an automaton state.
c    -(-b^{1, 959}_2 ∧  b^{1, 959}_1 ∧  b^{1, 959}_0 ∧ true) 
c  in CNF:
c     b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ false 
c  in DIMACS:
 4037 -4038 -4039  0
c  -3 does not represent an automaton state.
c    -( b^{1, 959}_2 ∧  b^{1, 959}_1 ∧  b^{1, 959}_0 ∧ true) 
c  in CNF:
c    -b^{1, 959}_2 ∨ -b^{1, 959}_1 ∨ -b^{1, 959}_0 ∨ false 
c  in DIMACS:
-4037 -4038 -4039  0

c i = 960
c  -2+1 --> -1
c    ( b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧  p_960) -> ( b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0)
c  in CNF:
c    -b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨  b^{1, 961}_2
c    -b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_1
c    -b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨  b^{1, 961}_0
c  in DIMACS:
-4040 -4041  4042 -960  4043 0
-4040 -4041  4042 -960 -4044 0
-4040 -4041  4042 -960  4045 0

c  -1+1 --> 0
c    ( b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0 ∧  p_960) -> (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧ -b^{1, 961}_0)
c  in CNF:
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_2
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_1
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_0
c  in DIMACS:
-4040  4041 -4042 -960 -4043 0
-4040  4041 -4042 -960 -4044 0
-4040  4041 -4042 -960 -4045 0

c  0+1 --> 1
c    (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧  p_960) -> (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0)
c  in CNF:
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_2
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_1
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨  b^{1, 961}_0
c  in DIMACS:
 4040  4041  4042 -960 -4043 0
 4040  4041  4042 -960 -4044 0
 4040  4041  4042 -960  4045 0

c  1+1 --> 2
c    (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0 ∧  p_960) -> (-b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0)
c  in CNF:
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_2
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨  b^{1, 961}_1
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ -p_960 ∨ -b^{1, 961}_0
c  in DIMACS:
 4040  4041 -4042 -960 -4043 0
 4040  4041 -4042 -960  4044 0
 4040  4041 -4042 -960 -4045 0

c  2+1 --> break 
c    (-b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧  p_960) -> break
c  in CNF:
c     b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 4040 -4041  4042 -960 1162 0


c  2-1 --> 1
c    (-b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧ -p_960) -> (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0)
c  in CNF:
c     b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_2
c     b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_1
c     b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨  b^{1, 961}_0
c  in DIMACS:
 4040 -4041  4042  960 -4043 0
 4040 -4041  4042  960 -4044 0
 4040 -4041  4042  960  4045 0

c  1-1 --> 0
c    (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0 ∧ -p_960) -> (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧ -b^{1, 961}_0)
c  in CNF:
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_2
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_1
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_0
c  in DIMACS:
 4040  4041 -4042  960 -4043 0
 4040  4041 -4042  960 -4044 0
 4040  4041 -4042  960 -4045 0

c  0-1 --> -1
c    (-b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧ -p_960) -> ( b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0)
c  in CNF:
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨  b^{1, 961}_2
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_1
c     b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨  b^{1, 961}_0
c  in DIMACS:
 4040  4041  4042  960  4043 0
 4040  4041  4042  960 -4044 0
 4040  4041  4042  960  4045 0

c  -1-1 --> -2
c    ( b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧  b^{1, 960}_0 ∧ -p_960) -> ( b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0)
c  in CNF:
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨  b^{1, 961}_2
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨  b^{1, 961}_1
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨  p_960 ∨ -b^{1, 961}_0
c  in DIMACS:
-4040  4041 -4042  960  4043 0
-4040  4041 -4042  960  4044 0
-4040  4041 -4042  960 -4045 0

c  -2-1 --> break 
c    ( b^{1, 960}_2 ∧  b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨  b^{1, 960}_0 ∨  p_960 ∨ break
c  in DIMACS:
-4040 -4041  4042  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 960}_2 ∧ -b^{1, 960}_1 ∧ -b^{1, 960}_0 ∧ true) 
c  in CNF:
c    -b^{1, 960}_2 ∨  b^{1, 960}_1 ∨  b^{1, 960}_0 ∨ false 
c  in DIMACS:
-4040  4041  4042  0

c  3 does not represent an automaton state.
c    -(-b^{1, 960}_2 ∧  b^{1, 960}_1 ∧  b^{1, 960}_0 ∧ true) 
c  in CNF:
c     b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ false 
c  in DIMACS:
 4040 -4041 -4042  0
c  -3 does not represent an automaton state.
c    -( b^{1, 960}_2 ∧  b^{1, 960}_1 ∧  b^{1, 960}_0 ∧ true) 
c  in CNF:
c    -b^{1, 960}_2 ∨ -b^{1, 960}_1 ∨ -b^{1, 960}_0 ∨ false 
c  in DIMACS:
-4040 -4041 -4042  0

c i = 961
c  -2+1 --> -1
c    ( b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧  p_961) -> ( b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0)
c  in CNF:
c    -b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨  b^{1, 962}_2
c    -b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_1
c    -b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨  b^{1, 962}_0
c  in DIMACS:
-4043 -4044  4045 -961  4046 0
-4043 -4044  4045 -961 -4047 0
-4043 -4044  4045 -961  4048 0

c  -1+1 --> 0
c    ( b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0 ∧  p_961) -> (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧ -b^{1, 962}_0)
c  in CNF:
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_2
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_1
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_0
c  in DIMACS:
-4043  4044 -4045 -961 -4046 0
-4043  4044 -4045 -961 -4047 0
-4043  4044 -4045 -961 -4048 0

c  0+1 --> 1
c    (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧  p_961) -> (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0)
c  in CNF:
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_2
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_1
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨  b^{1, 962}_0
c  in DIMACS:
 4043  4044  4045 -961 -4046 0
 4043  4044  4045 -961 -4047 0
 4043  4044  4045 -961  4048 0

c  1+1 --> 2
c    (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0 ∧  p_961) -> (-b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0)
c  in CNF:
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_2
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨  b^{1, 962}_1
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ -p_961 ∨ -b^{1, 962}_0
c  in DIMACS:
 4043  4044 -4045 -961 -4046 0
 4043  4044 -4045 -961  4047 0
 4043  4044 -4045 -961 -4048 0

c  2+1 --> break 
c    (-b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧  p_961) -> break
c  in CNF:
c     b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ -p_961 ∨ break
c  in DIMACS:
 4043 -4044  4045 -961 1162 0


c  2-1 --> 1
c    (-b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧ -p_961) -> (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0)
c  in CNF:
c     b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_2
c     b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_1
c     b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨  b^{1, 962}_0
c  in DIMACS:
 4043 -4044  4045  961 -4046 0
 4043 -4044  4045  961 -4047 0
 4043 -4044  4045  961  4048 0

c  1-1 --> 0
c    (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0 ∧ -p_961) -> (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧ -b^{1, 962}_0)
c  in CNF:
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_2
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_1
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_0
c  in DIMACS:
 4043  4044 -4045  961 -4046 0
 4043  4044 -4045  961 -4047 0
 4043  4044 -4045  961 -4048 0

c  0-1 --> -1
c    (-b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧ -p_961) -> ( b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0)
c  in CNF:
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨  b^{1, 962}_2
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_1
c     b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨  b^{1, 962}_0
c  in DIMACS:
 4043  4044  4045  961  4046 0
 4043  4044  4045  961 -4047 0
 4043  4044  4045  961  4048 0

c  -1-1 --> -2
c    ( b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧  b^{1, 961}_0 ∧ -p_961) -> ( b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0)
c  in CNF:
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨  b^{1, 962}_2
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨  b^{1, 962}_1
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨  p_961 ∨ -b^{1, 962}_0
c  in DIMACS:
-4043  4044 -4045  961  4046 0
-4043  4044 -4045  961  4047 0
-4043  4044 -4045  961 -4048 0

c  -2-1 --> break 
c    ( b^{1, 961}_2 ∧  b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧ -p_961) -> break
c  in CNF:
c    -b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨  b^{1, 961}_0 ∨  p_961 ∨ break
c  in DIMACS:
-4043 -4044  4045  961 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 961}_2 ∧ -b^{1, 961}_1 ∧ -b^{1, 961}_0 ∧ true) 
c  in CNF:
c    -b^{1, 961}_2 ∨  b^{1, 961}_1 ∨  b^{1, 961}_0 ∨ false 
c  in DIMACS:
-4043  4044  4045  0

c  3 does not represent an automaton state.
c    -(-b^{1, 961}_2 ∧  b^{1, 961}_1 ∧  b^{1, 961}_0 ∧ true) 
c  in CNF:
c     b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ false 
c  in DIMACS:
 4043 -4044 -4045  0
c  -3 does not represent an automaton state.
c    -( b^{1, 961}_2 ∧  b^{1, 961}_1 ∧  b^{1, 961}_0 ∧ true) 
c  in CNF:
c    -b^{1, 961}_2 ∨ -b^{1, 961}_1 ∨ -b^{1, 961}_0 ∨ false 
c  in DIMACS:
-4043 -4044 -4045  0

c i = 962
c  -2+1 --> -1
c    ( b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧  p_962) -> ( b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0)
c  in CNF:
c    -b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨  b^{1, 963}_2
c    -b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_1
c    -b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨  b^{1, 963}_0
c  in DIMACS:
-4046 -4047  4048 -962  4049 0
-4046 -4047  4048 -962 -4050 0
-4046 -4047  4048 -962  4051 0

c  -1+1 --> 0
c    ( b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0 ∧  p_962) -> (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧ -b^{1, 963}_0)
c  in CNF:
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_2
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_1
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_0
c  in DIMACS:
-4046  4047 -4048 -962 -4049 0
-4046  4047 -4048 -962 -4050 0
-4046  4047 -4048 -962 -4051 0

c  0+1 --> 1
c    (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧  p_962) -> (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0)
c  in CNF:
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_2
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_1
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨  b^{1, 963}_0
c  in DIMACS:
 4046  4047  4048 -962 -4049 0
 4046  4047  4048 -962 -4050 0
 4046  4047  4048 -962  4051 0

c  1+1 --> 2
c    (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0 ∧  p_962) -> (-b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0)
c  in CNF:
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_2
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨  b^{1, 963}_1
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ -p_962 ∨ -b^{1, 963}_0
c  in DIMACS:
 4046  4047 -4048 -962 -4049 0
 4046  4047 -4048 -962  4050 0
 4046  4047 -4048 -962 -4051 0

c  2+1 --> break 
c    (-b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧  p_962) -> break
c  in CNF:
c     b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 4046 -4047  4048 -962 1162 0


c  2-1 --> 1
c    (-b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧ -p_962) -> (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0)
c  in CNF:
c     b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_2
c     b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_1
c     b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨  b^{1, 963}_0
c  in DIMACS:
 4046 -4047  4048  962 -4049 0
 4046 -4047  4048  962 -4050 0
 4046 -4047  4048  962  4051 0

c  1-1 --> 0
c    (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0 ∧ -p_962) -> (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧ -b^{1, 963}_0)
c  in CNF:
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_2
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_1
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_0
c  in DIMACS:
 4046  4047 -4048  962 -4049 0
 4046  4047 -4048  962 -4050 0
 4046  4047 -4048  962 -4051 0

c  0-1 --> -1
c    (-b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧ -p_962) -> ( b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0)
c  in CNF:
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨  b^{1, 963}_2
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_1
c     b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨  b^{1, 963}_0
c  in DIMACS:
 4046  4047  4048  962  4049 0
 4046  4047  4048  962 -4050 0
 4046  4047  4048  962  4051 0

c  -1-1 --> -2
c    ( b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧  b^{1, 962}_0 ∧ -p_962) -> ( b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0)
c  in CNF:
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨  b^{1, 963}_2
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨  b^{1, 963}_1
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨  p_962 ∨ -b^{1, 963}_0
c  in DIMACS:
-4046  4047 -4048  962  4049 0
-4046  4047 -4048  962  4050 0
-4046  4047 -4048  962 -4051 0

c  -2-1 --> break 
c    ( b^{1, 962}_2 ∧  b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨  b^{1, 962}_0 ∨  p_962 ∨ break
c  in DIMACS:
-4046 -4047  4048  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 962}_2 ∧ -b^{1, 962}_1 ∧ -b^{1, 962}_0 ∧ true) 
c  in CNF:
c    -b^{1, 962}_2 ∨  b^{1, 962}_1 ∨  b^{1, 962}_0 ∨ false 
c  in DIMACS:
-4046  4047  4048  0

c  3 does not represent an automaton state.
c    -(-b^{1, 962}_2 ∧  b^{1, 962}_1 ∧  b^{1, 962}_0 ∧ true) 
c  in CNF:
c     b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ false 
c  in DIMACS:
 4046 -4047 -4048  0
c  -3 does not represent an automaton state.
c    -( b^{1, 962}_2 ∧  b^{1, 962}_1 ∧  b^{1, 962}_0 ∧ true) 
c  in CNF:
c    -b^{1, 962}_2 ∨ -b^{1, 962}_1 ∨ -b^{1, 962}_0 ∨ false 
c  in DIMACS:
-4046 -4047 -4048  0

c i = 963
c  -2+1 --> -1
c    ( b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧  p_963) -> ( b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0)
c  in CNF:
c    -b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨  b^{1, 964}_2
c    -b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_1
c    -b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨  b^{1, 964}_0
c  in DIMACS:
-4049 -4050  4051 -963  4052 0
-4049 -4050  4051 -963 -4053 0
-4049 -4050  4051 -963  4054 0

c  -1+1 --> 0
c    ( b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0 ∧  p_963) -> (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧ -b^{1, 964}_0)
c  in CNF:
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_2
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_1
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_0
c  in DIMACS:
-4049  4050 -4051 -963 -4052 0
-4049  4050 -4051 -963 -4053 0
-4049  4050 -4051 -963 -4054 0

c  0+1 --> 1
c    (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧  p_963) -> (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0)
c  in CNF:
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_2
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_1
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨  b^{1, 964}_0
c  in DIMACS:
 4049  4050  4051 -963 -4052 0
 4049  4050  4051 -963 -4053 0
 4049  4050  4051 -963  4054 0

c  1+1 --> 2
c    (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0 ∧  p_963) -> (-b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0)
c  in CNF:
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_2
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨  b^{1, 964}_1
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ -p_963 ∨ -b^{1, 964}_0
c  in DIMACS:
 4049  4050 -4051 -963 -4052 0
 4049  4050 -4051 -963  4053 0
 4049  4050 -4051 -963 -4054 0

c  2+1 --> break 
c    (-b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧  p_963) -> break
c  in CNF:
c     b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ -p_963 ∨ break
c  in DIMACS:
 4049 -4050  4051 -963 1162 0


c  2-1 --> 1
c    (-b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧ -p_963) -> (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0)
c  in CNF:
c     b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_2
c     b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_1
c     b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨  b^{1, 964}_0
c  in DIMACS:
 4049 -4050  4051  963 -4052 0
 4049 -4050  4051  963 -4053 0
 4049 -4050  4051  963  4054 0

c  1-1 --> 0
c    (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0 ∧ -p_963) -> (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧ -b^{1, 964}_0)
c  in CNF:
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_2
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_1
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_0
c  in DIMACS:
 4049  4050 -4051  963 -4052 0
 4049  4050 -4051  963 -4053 0
 4049  4050 -4051  963 -4054 0

c  0-1 --> -1
c    (-b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧ -p_963) -> ( b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0)
c  in CNF:
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨  b^{1, 964}_2
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_1
c     b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨  b^{1, 964}_0
c  in DIMACS:
 4049  4050  4051  963  4052 0
 4049  4050  4051  963 -4053 0
 4049  4050  4051  963  4054 0

c  -1-1 --> -2
c    ( b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧  b^{1, 963}_0 ∧ -p_963) -> ( b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0)
c  in CNF:
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨  b^{1, 964}_2
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨  b^{1, 964}_1
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨  p_963 ∨ -b^{1, 964}_0
c  in DIMACS:
-4049  4050 -4051  963  4052 0
-4049  4050 -4051  963  4053 0
-4049  4050 -4051  963 -4054 0

c  -2-1 --> break 
c    ( b^{1, 963}_2 ∧  b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧ -p_963) -> break
c  in CNF:
c    -b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨  b^{1, 963}_0 ∨  p_963 ∨ break
c  in DIMACS:
-4049 -4050  4051  963 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 963}_2 ∧ -b^{1, 963}_1 ∧ -b^{1, 963}_0 ∧ true) 
c  in CNF:
c    -b^{1, 963}_2 ∨  b^{1, 963}_1 ∨  b^{1, 963}_0 ∨ false 
c  in DIMACS:
-4049  4050  4051  0

c  3 does not represent an automaton state.
c    -(-b^{1, 963}_2 ∧  b^{1, 963}_1 ∧  b^{1, 963}_0 ∧ true) 
c  in CNF:
c     b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ false 
c  in DIMACS:
 4049 -4050 -4051  0
c  -3 does not represent an automaton state.
c    -( b^{1, 963}_2 ∧  b^{1, 963}_1 ∧  b^{1, 963}_0 ∧ true) 
c  in CNF:
c    -b^{1, 963}_2 ∨ -b^{1, 963}_1 ∨ -b^{1, 963}_0 ∨ false 
c  in DIMACS:
-4049 -4050 -4051  0

c i = 964
c  -2+1 --> -1
c    ( b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧  p_964) -> ( b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0)
c  in CNF:
c    -b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨  b^{1, 965}_2
c    -b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_1
c    -b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨  b^{1, 965}_0
c  in DIMACS:
-4052 -4053  4054 -964  4055 0
-4052 -4053  4054 -964 -4056 0
-4052 -4053  4054 -964  4057 0

c  -1+1 --> 0
c    ( b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0 ∧  p_964) -> (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧ -b^{1, 965}_0)
c  in CNF:
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_2
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_1
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_0
c  in DIMACS:
-4052  4053 -4054 -964 -4055 0
-4052  4053 -4054 -964 -4056 0
-4052  4053 -4054 -964 -4057 0

c  0+1 --> 1
c    (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧  p_964) -> (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0)
c  in CNF:
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_2
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_1
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨  b^{1, 965}_0
c  in DIMACS:
 4052  4053  4054 -964 -4055 0
 4052  4053  4054 -964 -4056 0
 4052  4053  4054 -964  4057 0

c  1+1 --> 2
c    (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0 ∧  p_964) -> (-b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0)
c  in CNF:
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_2
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨  b^{1, 965}_1
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ -p_964 ∨ -b^{1, 965}_0
c  in DIMACS:
 4052  4053 -4054 -964 -4055 0
 4052  4053 -4054 -964  4056 0
 4052  4053 -4054 -964 -4057 0

c  2+1 --> break 
c    (-b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧  p_964) -> break
c  in CNF:
c     b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ -p_964 ∨ break
c  in DIMACS:
 4052 -4053  4054 -964 1162 0


c  2-1 --> 1
c    (-b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧ -p_964) -> (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0)
c  in CNF:
c     b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_2
c     b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_1
c     b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨  b^{1, 965}_0
c  in DIMACS:
 4052 -4053  4054  964 -4055 0
 4052 -4053  4054  964 -4056 0
 4052 -4053  4054  964  4057 0

c  1-1 --> 0
c    (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0 ∧ -p_964) -> (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧ -b^{1, 965}_0)
c  in CNF:
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_2
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_1
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_0
c  in DIMACS:
 4052  4053 -4054  964 -4055 0
 4052  4053 -4054  964 -4056 0
 4052  4053 -4054  964 -4057 0

c  0-1 --> -1
c    (-b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧ -p_964) -> ( b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0)
c  in CNF:
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨  b^{1, 965}_2
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_1
c     b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨  b^{1, 965}_0
c  in DIMACS:
 4052  4053  4054  964  4055 0
 4052  4053  4054  964 -4056 0
 4052  4053  4054  964  4057 0

c  -1-1 --> -2
c    ( b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧  b^{1, 964}_0 ∧ -p_964) -> ( b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0)
c  in CNF:
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨  b^{1, 965}_2
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨  b^{1, 965}_1
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨  p_964 ∨ -b^{1, 965}_0
c  in DIMACS:
-4052  4053 -4054  964  4055 0
-4052  4053 -4054  964  4056 0
-4052  4053 -4054  964 -4057 0

c  -2-1 --> break 
c    ( b^{1, 964}_2 ∧  b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧ -p_964) -> break
c  in CNF:
c    -b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨  b^{1, 964}_0 ∨  p_964 ∨ break
c  in DIMACS:
-4052 -4053  4054  964 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 964}_2 ∧ -b^{1, 964}_1 ∧ -b^{1, 964}_0 ∧ true) 
c  in CNF:
c    -b^{1, 964}_2 ∨  b^{1, 964}_1 ∨  b^{1, 964}_0 ∨ false 
c  in DIMACS:
-4052  4053  4054  0

c  3 does not represent an automaton state.
c    -(-b^{1, 964}_2 ∧  b^{1, 964}_1 ∧  b^{1, 964}_0 ∧ true) 
c  in CNF:
c     b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ false 
c  in DIMACS:
 4052 -4053 -4054  0
c  -3 does not represent an automaton state.
c    -( b^{1, 964}_2 ∧  b^{1, 964}_1 ∧  b^{1, 964}_0 ∧ true) 
c  in CNF:
c    -b^{1, 964}_2 ∨ -b^{1, 964}_1 ∨ -b^{1, 964}_0 ∨ false 
c  in DIMACS:
-4052 -4053 -4054  0

c i = 965
c  -2+1 --> -1
c    ( b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧  p_965) -> ( b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0)
c  in CNF:
c    -b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨  b^{1, 966}_2
c    -b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_1
c    -b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨  b^{1, 966}_0
c  in DIMACS:
-4055 -4056  4057 -965  4058 0
-4055 -4056  4057 -965 -4059 0
-4055 -4056  4057 -965  4060 0

c  -1+1 --> 0
c    ( b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0 ∧  p_965) -> (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧ -b^{1, 966}_0)
c  in CNF:
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_2
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_1
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_0
c  in DIMACS:
-4055  4056 -4057 -965 -4058 0
-4055  4056 -4057 -965 -4059 0
-4055  4056 -4057 -965 -4060 0

c  0+1 --> 1
c    (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧  p_965) -> (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0)
c  in CNF:
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_2
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_1
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨  b^{1, 966}_0
c  in DIMACS:
 4055  4056  4057 -965 -4058 0
 4055  4056  4057 -965 -4059 0
 4055  4056  4057 -965  4060 0

c  1+1 --> 2
c    (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0 ∧  p_965) -> (-b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0)
c  in CNF:
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_2
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨  b^{1, 966}_1
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ -p_965 ∨ -b^{1, 966}_0
c  in DIMACS:
 4055  4056 -4057 -965 -4058 0
 4055  4056 -4057 -965  4059 0
 4055  4056 -4057 -965 -4060 0

c  2+1 --> break 
c    (-b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧  p_965) -> break
c  in CNF:
c     b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ -p_965 ∨ break
c  in DIMACS:
 4055 -4056  4057 -965 1162 0


c  2-1 --> 1
c    (-b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧ -p_965) -> (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0)
c  in CNF:
c     b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_2
c     b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_1
c     b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨  b^{1, 966}_0
c  in DIMACS:
 4055 -4056  4057  965 -4058 0
 4055 -4056  4057  965 -4059 0
 4055 -4056  4057  965  4060 0

c  1-1 --> 0
c    (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0 ∧ -p_965) -> (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧ -b^{1, 966}_0)
c  in CNF:
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_2
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_1
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_0
c  in DIMACS:
 4055  4056 -4057  965 -4058 0
 4055  4056 -4057  965 -4059 0
 4055  4056 -4057  965 -4060 0

c  0-1 --> -1
c    (-b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧ -p_965) -> ( b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0)
c  in CNF:
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨  b^{1, 966}_2
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_1
c     b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨  b^{1, 966}_0
c  in DIMACS:
 4055  4056  4057  965  4058 0
 4055  4056  4057  965 -4059 0
 4055  4056  4057  965  4060 0

c  -1-1 --> -2
c    ( b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧  b^{1, 965}_0 ∧ -p_965) -> ( b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0)
c  in CNF:
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨  b^{1, 966}_2
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨  b^{1, 966}_1
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨  p_965 ∨ -b^{1, 966}_0
c  in DIMACS:
-4055  4056 -4057  965  4058 0
-4055  4056 -4057  965  4059 0
-4055  4056 -4057  965 -4060 0

c  -2-1 --> break 
c    ( b^{1, 965}_2 ∧  b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧ -p_965) -> break
c  in CNF:
c    -b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨  b^{1, 965}_0 ∨  p_965 ∨ break
c  in DIMACS:
-4055 -4056  4057  965 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 965}_2 ∧ -b^{1, 965}_1 ∧ -b^{1, 965}_0 ∧ true) 
c  in CNF:
c    -b^{1, 965}_2 ∨  b^{1, 965}_1 ∨  b^{1, 965}_0 ∨ false 
c  in DIMACS:
-4055  4056  4057  0

c  3 does not represent an automaton state.
c    -(-b^{1, 965}_2 ∧  b^{1, 965}_1 ∧  b^{1, 965}_0 ∧ true) 
c  in CNF:
c     b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ false 
c  in DIMACS:
 4055 -4056 -4057  0
c  -3 does not represent an automaton state.
c    -( b^{1, 965}_2 ∧  b^{1, 965}_1 ∧  b^{1, 965}_0 ∧ true) 
c  in CNF:
c    -b^{1, 965}_2 ∨ -b^{1, 965}_1 ∨ -b^{1, 965}_0 ∨ false 
c  in DIMACS:
-4055 -4056 -4057  0

c i = 966
c  -2+1 --> -1
c    ( b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧  p_966) -> ( b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0)
c  in CNF:
c    -b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨  b^{1, 967}_2
c    -b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_1
c    -b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨  b^{1, 967}_0
c  in DIMACS:
-4058 -4059  4060 -966  4061 0
-4058 -4059  4060 -966 -4062 0
-4058 -4059  4060 -966  4063 0

c  -1+1 --> 0
c    ( b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0 ∧  p_966) -> (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧ -b^{1, 967}_0)
c  in CNF:
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_2
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_1
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_0
c  in DIMACS:
-4058  4059 -4060 -966 -4061 0
-4058  4059 -4060 -966 -4062 0
-4058  4059 -4060 -966 -4063 0

c  0+1 --> 1
c    (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧  p_966) -> (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0)
c  in CNF:
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_2
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_1
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨  b^{1, 967}_0
c  in DIMACS:
 4058  4059  4060 -966 -4061 0
 4058  4059  4060 -966 -4062 0
 4058  4059  4060 -966  4063 0

c  1+1 --> 2
c    (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0 ∧  p_966) -> (-b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0)
c  in CNF:
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_2
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨  b^{1, 967}_1
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ -p_966 ∨ -b^{1, 967}_0
c  in DIMACS:
 4058  4059 -4060 -966 -4061 0
 4058  4059 -4060 -966  4062 0
 4058  4059 -4060 -966 -4063 0

c  2+1 --> break 
c    (-b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧  p_966) -> break
c  in CNF:
c     b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 4058 -4059  4060 -966 1162 0


c  2-1 --> 1
c    (-b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧ -p_966) -> (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0)
c  in CNF:
c     b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_2
c     b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_1
c     b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨  b^{1, 967}_0
c  in DIMACS:
 4058 -4059  4060  966 -4061 0
 4058 -4059  4060  966 -4062 0
 4058 -4059  4060  966  4063 0

c  1-1 --> 0
c    (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0 ∧ -p_966) -> (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧ -b^{1, 967}_0)
c  in CNF:
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_2
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_1
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_0
c  in DIMACS:
 4058  4059 -4060  966 -4061 0
 4058  4059 -4060  966 -4062 0
 4058  4059 -4060  966 -4063 0

c  0-1 --> -1
c    (-b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧ -p_966) -> ( b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0)
c  in CNF:
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨  b^{1, 967}_2
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_1
c     b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨  b^{1, 967}_0
c  in DIMACS:
 4058  4059  4060  966  4061 0
 4058  4059  4060  966 -4062 0
 4058  4059  4060  966  4063 0

c  -1-1 --> -2
c    ( b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧  b^{1, 966}_0 ∧ -p_966) -> ( b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0)
c  in CNF:
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨  b^{1, 967}_2
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨  b^{1, 967}_1
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨  p_966 ∨ -b^{1, 967}_0
c  in DIMACS:
-4058  4059 -4060  966  4061 0
-4058  4059 -4060  966  4062 0
-4058  4059 -4060  966 -4063 0

c  -2-1 --> break 
c    ( b^{1, 966}_2 ∧  b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨  b^{1, 966}_0 ∨  p_966 ∨ break
c  in DIMACS:
-4058 -4059  4060  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 966}_2 ∧ -b^{1, 966}_1 ∧ -b^{1, 966}_0 ∧ true) 
c  in CNF:
c    -b^{1, 966}_2 ∨  b^{1, 966}_1 ∨  b^{1, 966}_0 ∨ false 
c  in DIMACS:
-4058  4059  4060  0

c  3 does not represent an automaton state.
c    -(-b^{1, 966}_2 ∧  b^{1, 966}_1 ∧  b^{1, 966}_0 ∧ true) 
c  in CNF:
c     b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ false 
c  in DIMACS:
 4058 -4059 -4060  0
c  -3 does not represent an automaton state.
c    -( b^{1, 966}_2 ∧  b^{1, 966}_1 ∧  b^{1, 966}_0 ∧ true) 
c  in CNF:
c    -b^{1, 966}_2 ∨ -b^{1, 966}_1 ∨ -b^{1, 966}_0 ∨ false 
c  in DIMACS:
-4058 -4059 -4060  0

c i = 967
c  -2+1 --> -1
c    ( b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧  p_967) -> ( b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0)
c  in CNF:
c    -b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨  b^{1, 968}_2
c    -b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_1
c    -b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨  b^{1, 968}_0
c  in DIMACS:
-4061 -4062  4063 -967  4064 0
-4061 -4062  4063 -967 -4065 0
-4061 -4062  4063 -967  4066 0

c  -1+1 --> 0
c    ( b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0 ∧  p_967) -> (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧ -b^{1, 968}_0)
c  in CNF:
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_2
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_1
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_0
c  in DIMACS:
-4061  4062 -4063 -967 -4064 0
-4061  4062 -4063 -967 -4065 0
-4061  4062 -4063 -967 -4066 0

c  0+1 --> 1
c    (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧  p_967) -> (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0)
c  in CNF:
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_2
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_1
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨  b^{1, 968}_0
c  in DIMACS:
 4061  4062  4063 -967 -4064 0
 4061  4062  4063 -967 -4065 0
 4061  4062  4063 -967  4066 0

c  1+1 --> 2
c    (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0 ∧  p_967) -> (-b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0)
c  in CNF:
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_2
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨  b^{1, 968}_1
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ -p_967 ∨ -b^{1, 968}_0
c  in DIMACS:
 4061  4062 -4063 -967 -4064 0
 4061  4062 -4063 -967  4065 0
 4061  4062 -4063 -967 -4066 0

c  2+1 --> break 
c    (-b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧  p_967) -> break
c  in CNF:
c     b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ -p_967 ∨ break
c  in DIMACS:
 4061 -4062  4063 -967 1162 0


c  2-1 --> 1
c    (-b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧ -p_967) -> (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0)
c  in CNF:
c     b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_2
c     b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_1
c     b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨  b^{1, 968}_0
c  in DIMACS:
 4061 -4062  4063  967 -4064 0
 4061 -4062  4063  967 -4065 0
 4061 -4062  4063  967  4066 0

c  1-1 --> 0
c    (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0 ∧ -p_967) -> (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧ -b^{1, 968}_0)
c  in CNF:
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_2
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_1
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_0
c  in DIMACS:
 4061  4062 -4063  967 -4064 0
 4061  4062 -4063  967 -4065 0
 4061  4062 -4063  967 -4066 0

c  0-1 --> -1
c    (-b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧ -p_967) -> ( b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0)
c  in CNF:
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨  b^{1, 968}_2
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_1
c     b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨  b^{1, 968}_0
c  in DIMACS:
 4061  4062  4063  967  4064 0
 4061  4062  4063  967 -4065 0
 4061  4062  4063  967  4066 0

c  -1-1 --> -2
c    ( b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧  b^{1, 967}_0 ∧ -p_967) -> ( b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0)
c  in CNF:
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨  b^{1, 968}_2
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨  b^{1, 968}_1
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨  p_967 ∨ -b^{1, 968}_0
c  in DIMACS:
-4061  4062 -4063  967  4064 0
-4061  4062 -4063  967  4065 0
-4061  4062 -4063  967 -4066 0

c  -2-1 --> break 
c    ( b^{1, 967}_2 ∧  b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧ -p_967) -> break
c  in CNF:
c    -b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨  b^{1, 967}_0 ∨  p_967 ∨ break
c  in DIMACS:
-4061 -4062  4063  967 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 967}_2 ∧ -b^{1, 967}_1 ∧ -b^{1, 967}_0 ∧ true) 
c  in CNF:
c    -b^{1, 967}_2 ∨  b^{1, 967}_1 ∨  b^{1, 967}_0 ∨ false 
c  in DIMACS:
-4061  4062  4063  0

c  3 does not represent an automaton state.
c    -(-b^{1, 967}_2 ∧  b^{1, 967}_1 ∧  b^{1, 967}_0 ∧ true) 
c  in CNF:
c     b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ false 
c  in DIMACS:
 4061 -4062 -4063  0
c  -3 does not represent an automaton state.
c    -( b^{1, 967}_2 ∧  b^{1, 967}_1 ∧  b^{1, 967}_0 ∧ true) 
c  in CNF:
c    -b^{1, 967}_2 ∨ -b^{1, 967}_1 ∨ -b^{1, 967}_0 ∨ false 
c  in DIMACS:
-4061 -4062 -4063  0

c i = 968
c  -2+1 --> -1
c    ( b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧  p_968) -> ( b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0)
c  in CNF:
c    -b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨  b^{1, 969}_2
c    -b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_1
c    -b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨  b^{1, 969}_0
c  in DIMACS:
-4064 -4065  4066 -968  4067 0
-4064 -4065  4066 -968 -4068 0
-4064 -4065  4066 -968  4069 0

c  -1+1 --> 0
c    ( b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0 ∧  p_968) -> (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧ -b^{1, 969}_0)
c  in CNF:
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_2
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_1
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_0
c  in DIMACS:
-4064  4065 -4066 -968 -4067 0
-4064  4065 -4066 -968 -4068 0
-4064  4065 -4066 -968 -4069 0

c  0+1 --> 1
c    (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧  p_968) -> (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0)
c  in CNF:
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_2
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_1
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨  b^{1, 969}_0
c  in DIMACS:
 4064  4065  4066 -968 -4067 0
 4064  4065  4066 -968 -4068 0
 4064  4065  4066 -968  4069 0

c  1+1 --> 2
c    (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0 ∧  p_968) -> (-b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0)
c  in CNF:
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_2
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨  b^{1, 969}_1
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ -p_968 ∨ -b^{1, 969}_0
c  in DIMACS:
 4064  4065 -4066 -968 -4067 0
 4064  4065 -4066 -968  4068 0
 4064  4065 -4066 -968 -4069 0

c  2+1 --> break 
c    (-b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧  p_968) -> break
c  in CNF:
c     b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 4064 -4065  4066 -968 1162 0


c  2-1 --> 1
c    (-b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧ -p_968) -> (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0)
c  in CNF:
c     b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_2
c     b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_1
c     b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨  b^{1, 969}_0
c  in DIMACS:
 4064 -4065  4066  968 -4067 0
 4064 -4065  4066  968 -4068 0
 4064 -4065  4066  968  4069 0

c  1-1 --> 0
c    (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0 ∧ -p_968) -> (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧ -b^{1, 969}_0)
c  in CNF:
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_2
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_1
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_0
c  in DIMACS:
 4064  4065 -4066  968 -4067 0
 4064  4065 -4066  968 -4068 0
 4064  4065 -4066  968 -4069 0

c  0-1 --> -1
c    (-b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧ -p_968) -> ( b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0)
c  in CNF:
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨  b^{1, 969}_2
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_1
c     b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨  b^{1, 969}_0
c  in DIMACS:
 4064  4065  4066  968  4067 0
 4064  4065  4066  968 -4068 0
 4064  4065  4066  968  4069 0

c  -1-1 --> -2
c    ( b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧  b^{1, 968}_0 ∧ -p_968) -> ( b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0)
c  in CNF:
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨  b^{1, 969}_2
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨  b^{1, 969}_1
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨  p_968 ∨ -b^{1, 969}_0
c  in DIMACS:
-4064  4065 -4066  968  4067 0
-4064  4065 -4066  968  4068 0
-4064  4065 -4066  968 -4069 0

c  -2-1 --> break 
c    ( b^{1, 968}_2 ∧  b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨  b^{1, 968}_0 ∨  p_968 ∨ break
c  in DIMACS:
-4064 -4065  4066  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 968}_2 ∧ -b^{1, 968}_1 ∧ -b^{1, 968}_0 ∧ true) 
c  in CNF:
c    -b^{1, 968}_2 ∨  b^{1, 968}_1 ∨  b^{1, 968}_0 ∨ false 
c  in DIMACS:
-4064  4065  4066  0

c  3 does not represent an automaton state.
c    -(-b^{1, 968}_2 ∧  b^{1, 968}_1 ∧  b^{1, 968}_0 ∧ true) 
c  in CNF:
c     b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ false 
c  in DIMACS:
 4064 -4065 -4066  0
c  -3 does not represent an automaton state.
c    -( b^{1, 968}_2 ∧  b^{1, 968}_1 ∧  b^{1, 968}_0 ∧ true) 
c  in CNF:
c    -b^{1, 968}_2 ∨ -b^{1, 968}_1 ∨ -b^{1, 968}_0 ∨ false 
c  in DIMACS:
-4064 -4065 -4066  0

c i = 969
c  -2+1 --> -1
c    ( b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧  p_969) -> ( b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0)
c  in CNF:
c    -b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨  b^{1, 970}_2
c    -b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_1
c    -b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨  b^{1, 970}_0
c  in DIMACS:
-4067 -4068  4069 -969  4070 0
-4067 -4068  4069 -969 -4071 0
-4067 -4068  4069 -969  4072 0

c  -1+1 --> 0
c    ( b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0 ∧  p_969) -> (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧ -b^{1, 970}_0)
c  in CNF:
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_2
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_1
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_0
c  in DIMACS:
-4067  4068 -4069 -969 -4070 0
-4067  4068 -4069 -969 -4071 0
-4067  4068 -4069 -969 -4072 0

c  0+1 --> 1
c    (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧  p_969) -> (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0)
c  in CNF:
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_2
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_1
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨  b^{1, 970}_0
c  in DIMACS:
 4067  4068  4069 -969 -4070 0
 4067  4068  4069 -969 -4071 0
 4067  4068  4069 -969  4072 0

c  1+1 --> 2
c    (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0 ∧  p_969) -> (-b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0)
c  in CNF:
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_2
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨  b^{1, 970}_1
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ -p_969 ∨ -b^{1, 970}_0
c  in DIMACS:
 4067  4068 -4069 -969 -4070 0
 4067  4068 -4069 -969  4071 0
 4067  4068 -4069 -969 -4072 0

c  2+1 --> break 
c    (-b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧  p_969) -> break
c  in CNF:
c     b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 4067 -4068  4069 -969 1162 0


c  2-1 --> 1
c    (-b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧ -p_969) -> (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0)
c  in CNF:
c     b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_2
c     b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_1
c     b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨  b^{1, 970}_0
c  in DIMACS:
 4067 -4068  4069  969 -4070 0
 4067 -4068  4069  969 -4071 0
 4067 -4068  4069  969  4072 0

c  1-1 --> 0
c    (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0 ∧ -p_969) -> (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧ -b^{1, 970}_0)
c  in CNF:
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_2
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_1
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_0
c  in DIMACS:
 4067  4068 -4069  969 -4070 0
 4067  4068 -4069  969 -4071 0
 4067  4068 -4069  969 -4072 0

c  0-1 --> -1
c    (-b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧ -p_969) -> ( b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0)
c  in CNF:
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨  b^{1, 970}_2
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_1
c     b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨  b^{1, 970}_0
c  in DIMACS:
 4067  4068  4069  969  4070 0
 4067  4068  4069  969 -4071 0
 4067  4068  4069  969  4072 0

c  -1-1 --> -2
c    ( b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧  b^{1, 969}_0 ∧ -p_969) -> ( b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0)
c  in CNF:
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨  b^{1, 970}_2
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨  b^{1, 970}_1
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨  p_969 ∨ -b^{1, 970}_0
c  in DIMACS:
-4067  4068 -4069  969  4070 0
-4067  4068 -4069  969  4071 0
-4067  4068 -4069  969 -4072 0

c  -2-1 --> break 
c    ( b^{1, 969}_2 ∧  b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨  b^{1, 969}_0 ∨  p_969 ∨ break
c  in DIMACS:
-4067 -4068  4069  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 969}_2 ∧ -b^{1, 969}_1 ∧ -b^{1, 969}_0 ∧ true) 
c  in CNF:
c    -b^{1, 969}_2 ∨  b^{1, 969}_1 ∨  b^{1, 969}_0 ∨ false 
c  in DIMACS:
-4067  4068  4069  0

c  3 does not represent an automaton state.
c    -(-b^{1, 969}_2 ∧  b^{1, 969}_1 ∧  b^{1, 969}_0 ∧ true) 
c  in CNF:
c     b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ false 
c  in DIMACS:
 4067 -4068 -4069  0
c  -3 does not represent an automaton state.
c    -( b^{1, 969}_2 ∧  b^{1, 969}_1 ∧  b^{1, 969}_0 ∧ true) 
c  in CNF:
c    -b^{1, 969}_2 ∨ -b^{1, 969}_1 ∨ -b^{1, 969}_0 ∨ false 
c  in DIMACS:
-4067 -4068 -4069  0

c i = 970
c  -2+1 --> -1
c    ( b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧  p_970) -> ( b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0)
c  in CNF:
c    -b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨  b^{1, 971}_2
c    -b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_1
c    -b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨  b^{1, 971}_0
c  in DIMACS:
-4070 -4071  4072 -970  4073 0
-4070 -4071  4072 -970 -4074 0
-4070 -4071  4072 -970  4075 0

c  -1+1 --> 0
c    ( b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0 ∧  p_970) -> (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧ -b^{1, 971}_0)
c  in CNF:
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_2
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_1
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_0
c  in DIMACS:
-4070  4071 -4072 -970 -4073 0
-4070  4071 -4072 -970 -4074 0
-4070  4071 -4072 -970 -4075 0

c  0+1 --> 1
c    (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧  p_970) -> (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0)
c  in CNF:
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_2
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_1
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨  b^{1, 971}_0
c  in DIMACS:
 4070  4071  4072 -970 -4073 0
 4070  4071  4072 -970 -4074 0
 4070  4071  4072 -970  4075 0

c  1+1 --> 2
c    (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0 ∧  p_970) -> (-b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0)
c  in CNF:
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_2
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨  b^{1, 971}_1
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ -p_970 ∨ -b^{1, 971}_0
c  in DIMACS:
 4070  4071 -4072 -970 -4073 0
 4070  4071 -4072 -970  4074 0
 4070  4071 -4072 -970 -4075 0

c  2+1 --> break 
c    (-b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧  p_970) -> break
c  in CNF:
c     b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 4070 -4071  4072 -970 1162 0


c  2-1 --> 1
c    (-b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧ -p_970) -> (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0)
c  in CNF:
c     b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_2
c     b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_1
c     b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨  b^{1, 971}_0
c  in DIMACS:
 4070 -4071  4072  970 -4073 0
 4070 -4071  4072  970 -4074 0
 4070 -4071  4072  970  4075 0

c  1-1 --> 0
c    (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0 ∧ -p_970) -> (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧ -b^{1, 971}_0)
c  in CNF:
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_2
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_1
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_0
c  in DIMACS:
 4070  4071 -4072  970 -4073 0
 4070  4071 -4072  970 -4074 0
 4070  4071 -4072  970 -4075 0

c  0-1 --> -1
c    (-b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧ -p_970) -> ( b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0)
c  in CNF:
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨  b^{1, 971}_2
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_1
c     b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨  b^{1, 971}_0
c  in DIMACS:
 4070  4071  4072  970  4073 0
 4070  4071  4072  970 -4074 0
 4070  4071  4072  970  4075 0

c  -1-1 --> -2
c    ( b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧  b^{1, 970}_0 ∧ -p_970) -> ( b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0)
c  in CNF:
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨  b^{1, 971}_2
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨  b^{1, 971}_1
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨  p_970 ∨ -b^{1, 971}_0
c  in DIMACS:
-4070  4071 -4072  970  4073 0
-4070  4071 -4072  970  4074 0
-4070  4071 -4072  970 -4075 0

c  -2-1 --> break 
c    ( b^{1, 970}_2 ∧  b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨  b^{1, 970}_0 ∨  p_970 ∨ break
c  in DIMACS:
-4070 -4071  4072  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 970}_2 ∧ -b^{1, 970}_1 ∧ -b^{1, 970}_0 ∧ true) 
c  in CNF:
c    -b^{1, 970}_2 ∨  b^{1, 970}_1 ∨  b^{1, 970}_0 ∨ false 
c  in DIMACS:
-4070  4071  4072  0

c  3 does not represent an automaton state.
c    -(-b^{1, 970}_2 ∧  b^{1, 970}_1 ∧  b^{1, 970}_0 ∧ true) 
c  in CNF:
c     b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ false 
c  in DIMACS:
 4070 -4071 -4072  0
c  -3 does not represent an automaton state.
c    -( b^{1, 970}_2 ∧  b^{1, 970}_1 ∧  b^{1, 970}_0 ∧ true) 
c  in CNF:
c    -b^{1, 970}_2 ∨ -b^{1, 970}_1 ∨ -b^{1, 970}_0 ∨ false 
c  in DIMACS:
-4070 -4071 -4072  0

c i = 971
c  -2+1 --> -1
c    ( b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧  p_971) -> ( b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0)
c  in CNF:
c    -b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨  b^{1, 972}_2
c    -b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_1
c    -b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨  b^{1, 972}_0
c  in DIMACS:
-4073 -4074  4075 -971  4076 0
-4073 -4074  4075 -971 -4077 0
-4073 -4074  4075 -971  4078 0

c  -1+1 --> 0
c    ( b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0 ∧  p_971) -> (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧ -b^{1, 972}_0)
c  in CNF:
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_2
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_1
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_0
c  in DIMACS:
-4073  4074 -4075 -971 -4076 0
-4073  4074 -4075 -971 -4077 0
-4073  4074 -4075 -971 -4078 0

c  0+1 --> 1
c    (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧  p_971) -> (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0)
c  in CNF:
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_2
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_1
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨  b^{1, 972}_0
c  in DIMACS:
 4073  4074  4075 -971 -4076 0
 4073  4074  4075 -971 -4077 0
 4073  4074  4075 -971  4078 0

c  1+1 --> 2
c    (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0 ∧  p_971) -> (-b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0)
c  in CNF:
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_2
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨  b^{1, 972}_1
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ -p_971 ∨ -b^{1, 972}_0
c  in DIMACS:
 4073  4074 -4075 -971 -4076 0
 4073  4074 -4075 -971  4077 0
 4073  4074 -4075 -971 -4078 0

c  2+1 --> break 
c    (-b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧  p_971) -> break
c  in CNF:
c     b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ -p_971 ∨ break
c  in DIMACS:
 4073 -4074  4075 -971 1162 0


c  2-1 --> 1
c    (-b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧ -p_971) -> (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0)
c  in CNF:
c     b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_2
c     b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_1
c     b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨  b^{1, 972}_0
c  in DIMACS:
 4073 -4074  4075  971 -4076 0
 4073 -4074  4075  971 -4077 0
 4073 -4074  4075  971  4078 0

c  1-1 --> 0
c    (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0 ∧ -p_971) -> (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧ -b^{1, 972}_0)
c  in CNF:
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_2
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_1
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_0
c  in DIMACS:
 4073  4074 -4075  971 -4076 0
 4073  4074 -4075  971 -4077 0
 4073  4074 -4075  971 -4078 0

c  0-1 --> -1
c    (-b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧ -p_971) -> ( b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0)
c  in CNF:
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨  b^{1, 972}_2
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_1
c     b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨  b^{1, 972}_0
c  in DIMACS:
 4073  4074  4075  971  4076 0
 4073  4074  4075  971 -4077 0
 4073  4074  4075  971  4078 0

c  -1-1 --> -2
c    ( b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧  b^{1, 971}_0 ∧ -p_971) -> ( b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0)
c  in CNF:
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨  b^{1, 972}_2
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨  b^{1, 972}_1
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨  p_971 ∨ -b^{1, 972}_0
c  in DIMACS:
-4073  4074 -4075  971  4076 0
-4073  4074 -4075  971  4077 0
-4073  4074 -4075  971 -4078 0

c  -2-1 --> break 
c    ( b^{1, 971}_2 ∧  b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧ -p_971) -> break
c  in CNF:
c    -b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨  b^{1, 971}_0 ∨  p_971 ∨ break
c  in DIMACS:
-4073 -4074  4075  971 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 971}_2 ∧ -b^{1, 971}_1 ∧ -b^{1, 971}_0 ∧ true) 
c  in CNF:
c    -b^{1, 971}_2 ∨  b^{1, 971}_1 ∨  b^{1, 971}_0 ∨ false 
c  in DIMACS:
-4073  4074  4075  0

c  3 does not represent an automaton state.
c    -(-b^{1, 971}_2 ∧  b^{1, 971}_1 ∧  b^{1, 971}_0 ∧ true) 
c  in CNF:
c     b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ false 
c  in DIMACS:
 4073 -4074 -4075  0
c  -3 does not represent an automaton state.
c    -( b^{1, 971}_2 ∧  b^{1, 971}_1 ∧  b^{1, 971}_0 ∧ true) 
c  in CNF:
c    -b^{1, 971}_2 ∨ -b^{1, 971}_1 ∨ -b^{1, 971}_0 ∨ false 
c  in DIMACS:
-4073 -4074 -4075  0

c i = 972
c  -2+1 --> -1
c    ( b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧  p_972) -> ( b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0)
c  in CNF:
c    -b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨  b^{1, 973}_2
c    -b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_1
c    -b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨  b^{1, 973}_0
c  in DIMACS:
-4076 -4077  4078 -972  4079 0
-4076 -4077  4078 -972 -4080 0
-4076 -4077  4078 -972  4081 0

c  -1+1 --> 0
c    ( b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0 ∧  p_972) -> (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧ -b^{1, 973}_0)
c  in CNF:
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_2
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_1
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_0
c  in DIMACS:
-4076  4077 -4078 -972 -4079 0
-4076  4077 -4078 -972 -4080 0
-4076  4077 -4078 -972 -4081 0

c  0+1 --> 1
c    (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧  p_972) -> (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0)
c  in CNF:
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_2
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_1
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨  b^{1, 973}_0
c  in DIMACS:
 4076  4077  4078 -972 -4079 0
 4076  4077  4078 -972 -4080 0
 4076  4077  4078 -972  4081 0

c  1+1 --> 2
c    (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0 ∧  p_972) -> (-b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0)
c  in CNF:
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_2
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨  b^{1, 973}_1
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ -p_972 ∨ -b^{1, 973}_0
c  in DIMACS:
 4076  4077 -4078 -972 -4079 0
 4076  4077 -4078 -972  4080 0
 4076  4077 -4078 -972 -4081 0

c  2+1 --> break 
c    (-b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧  p_972) -> break
c  in CNF:
c     b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 4076 -4077  4078 -972 1162 0


c  2-1 --> 1
c    (-b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧ -p_972) -> (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0)
c  in CNF:
c     b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_2
c     b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_1
c     b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨  b^{1, 973}_0
c  in DIMACS:
 4076 -4077  4078  972 -4079 0
 4076 -4077  4078  972 -4080 0
 4076 -4077  4078  972  4081 0

c  1-1 --> 0
c    (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0 ∧ -p_972) -> (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧ -b^{1, 973}_0)
c  in CNF:
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_2
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_1
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_0
c  in DIMACS:
 4076  4077 -4078  972 -4079 0
 4076  4077 -4078  972 -4080 0
 4076  4077 -4078  972 -4081 0

c  0-1 --> -1
c    (-b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧ -p_972) -> ( b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0)
c  in CNF:
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨  b^{1, 973}_2
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_1
c     b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨  b^{1, 973}_0
c  in DIMACS:
 4076  4077  4078  972  4079 0
 4076  4077  4078  972 -4080 0
 4076  4077  4078  972  4081 0

c  -1-1 --> -2
c    ( b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧  b^{1, 972}_0 ∧ -p_972) -> ( b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0)
c  in CNF:
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨  b^{1, 973}_2
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨  b^{1, 973}_1
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨  p_972 ∨ -b^{1, 973}_0
c  in DIMACS:
-4076  4077 -4078  972  4079 0
-4076  4077 -4078  972  4080 0
-4076  4077 -4078  972 -4081 0

c  -2-1 --> break 
c    ( b^{1, 972}_2 ∧  b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨  b^{1, 972}_0 ∨  p_972 ∨ break
c  in DIMACS:
-4076 -4077  4078  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 972}_2 ∧ -b^{1, 972}_1 ∧ -b^{1, 972}_0 ∧ true) 
c  in CNF:
c    -b^{1, 972}_2 ∨  b^{1, 972}_1 ∨  b^{1, 972}_0 ∨ false 
c  in DIMACS:
-4076  4077  4078  0

c  3 does not represent an automaton state.
c    -(-b^{1, 972}_2 ∧  b^{1, 972}_1 ∧  b^{1, 972}_0 ∧ true) 
c  in CNF:
c     b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ false 
c  in DIMACS:
 4076 -4077 -4078  0
c  -3 does not represent an automaton state.
c    -( b^{1, 972}_2 ∧  b^{1, 972}_1 ∧  b^{1, 972}_0 ∧ true) 
c  in CNF:
c    -b^{1, 972}_2 ∨ -b^{1, 972}_1 ∨ -b^{1, 972}_0 ∨ false 
c  in DIMACS:
-4076 -4077 -4078  0

c i = 973
c  -2+1 --> -1
c    ( b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧  p_973) -> ( b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0)
c  in CNF:
c    -b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨  b^{1, 974}_2
c    -b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_1
c    -b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨  b^{1, 974}_0
c  in DIMACS:
-4079 -4080  4081 -973  4082 0
-4079 -4080  4081 -973 -4083 0
-4079 -4080  4081 -973  4084 0

c  -1+1 --> 0
c    ( b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0 ∧  p_973) -> (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧ -b^{1, 974}_0)
c  in CNF:
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_2
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_1
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_0
c  in DIMACS:
-4079  4080 -4081 -973 -4082 0
-4079  4080 -4081 -973 -4083 0
-4079  4080 -4081 -973 -4084 0

c  0+1 --> 1
c    (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧  p_973) -> (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0)
c  in CNF:
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_2
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_1
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨  b^{1, 974}_0
c  in DIMACS:
 4079  4080  4081 -973 -4082 0
 4079  4080  4081 -973 -4083 0
 4079  4080  4081 -973  4084 0

c  1+1 --> 2
c    (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0 ∧  p_973) -> (-b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0)
c  in CNF:
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_2
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨  b^{1, 974}_1
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ -p_973 ∨ -b^{1, 974}_0
c  in DIMACS:
 4079  4080 -4081 -973 -4082 0
 4079  4080 -4081 -973  4083 0
 4079  4080 -4081 -973 -4084 0

c  2+1 --> break 
c    (-b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧  p_973) -> break
c  in CNF:
c     b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ -p_973 ∨ break
c  in DIMACS:
 4079 -4080  4081 -973 1162 0


c  2-1 --> 1
c    (-b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧ -p_973) -> (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0)
c  in CNF:
c     b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_2
c     b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_1
c     b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨  b^{1, 974}_0
c  in DIMACS:
 4079 -4080  4081  973 -4082 0
 4079 -4080  4081  973 -4083 0
 4079 -4080  4081  973  4084 0

c  1-1 --> 0
c    (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0 ∧ -p_973) -> (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧ -b^{1, 974}_0)
c  in CNF:
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_2
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_1
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_0
c  in DIMACS:
 4079  4080 -4081  973 -4082 0
 4079  4080 -4081  973 -4083 0
 4079  4080 -4081  973 -4084 0

c  0-1 --> -1
c    (-b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧ -p_973) -> ( b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0)
c  in CNF:
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨  b^{1, 974}_2
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_1
c     b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨  b^{1, 974}_0
c  in DIMACS:
 4079  4080  4081  973  4082 0
 4079  4080  4081  973 -4083 0
 4079  4080  4081  973  4084 0

c  -1-1 --> -2
c    ( b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧  b^{1, 973}_0 ∧ -p_973) -> ( b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0)
c  in CNF:
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨  b^{1, 974}_2
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨  b^{1, 974}_1
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨  p_973 ∨ -b^{1, 974}_0
c  in DIMACS:
-4079  4080 -4081  973  4082 0
-4079  4080 -4081  973  4083 0
-4079  4080 -4081  973 -4084 0

c  -2-1 --> break 
c    ( b^{1, 973}_2 ∧  b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧ -p_973) -> break
c  in CNF:
c    -b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨  b^{1, 973}_0 ∨  p_973 ∨ break
c  in DIMACS:
-4079 -4080  4081  973 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 973}_2 ∧ -b^{1, 973}_1 ∧ -b^{1, 973}_0 ∧ true) 
c  in CNF:
c    -b^{1, 973}_2 ∨  b^{1, 973}_1 ∨  b^{1, 973}_0 ∨ false 
c  in DIMACS:
-4079  4080  4081  0

c  3 does not represent an automaton state.
c    -(-b^{1, 973}_2 ∧  b^{1, 973}_1 ∧  b^{1, 973}_0 ∧ true) 
c  in CNF:
c     b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ false 
c  in DIMACS:
 4079 -4080 -4081  0
c  -3 does not represent an automaton state.
c    -( b^{1, 973}_2 ∧  b^{1, 973}_1 ∧  b^{1, 973}_0 ∧ true) 
c  in CNF:
c    -b^{1, 973}_2 ∨ -b^{1, 973}_1 ∨ -b^{1, 973}_0 ∨ false 
c  in DIMACS:
-4079 -4080 -4081  0

c i = 974
c  -2+1 --> -1
c    ( b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧  p_974) -> ( b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0)
c  in CNF:
c    -b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨  b^{1, 975}_2
c    -b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_1
c    -b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨  b^{1, 975}_0
c  in DIMACS:
-4082 -4083  4084 -974  4085 0
-4082 -4083  4084 -974 -4086 0
-4082 -4083  4084 -974  4087 0

c  -1+1 --> 0
c    ( b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0 ∧  p_974) -> (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧ -b^{1, 975}_0)
c  in CNF:
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_2
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_1
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_0
c  in DIMACS:
-4082  4083 -4084 -974 -4085 0
-4082  4083 -4084 -974 -4086 0
-4082  4083 -4084 -974 -4087 0

c  0+1 --> 1
c    (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧  p_974) -> (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0)
c  in CNF:
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_2
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_1
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨  b^{1, 975}_0
c  in DIMACS:
 4082  4083  4084 -974 -4085 0
 4082  4083  4084 -974 -4086 0
 4082  4083  4084 -974  4087 0

c  1+1 --> 2
c    (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0 ∧  p_974) -> (-b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0)
c  in CNF:
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_2
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨  b^{1, 975}_1
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ -p_974 ∨ -b^{1, 975}_0
c  in DIMACS:
 4082  4083 -4084 -974 -4085 0
 4082  4083 -4084 -974  4086 0
 4082  4083 -4084 -974 -4087 0

c  2+1 --> break 
c    (-b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧  p_974) -> break
c  in CNF:
c     b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ -p_974 ∨ break
c  in DIMACS:
 4082 -4083  4084 -974 1162 0


c  2-1 --> 1
c    (-b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧ -p_974) -> (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0)
c  in CNF:
c     b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_2
c     b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_1
c     b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨  b^{1, 975}_0
c  in DIMACS:
 4082 -4083  4084  974 -4085 0
 4082 -4083  4084  974 -4086 0
 4082 -4083  4084  974  4087 0

c  1-1 --> 0
c    (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0 ∧ -p_974) -> (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧ -b^{1, 975}_0)
c  in CNF:
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_2
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_1
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_0
c  in DIMACS:
 4082  4083 -4084  974 -4085 0
 4082  4083 -4084  974 -4086 0
 4082  4083 -4084  974 -4087 0

c  0-1 --> -1
c    (-b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧ -p_974) -> ( b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0)
c  in CNF:
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨  b^{1, 975}_2
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_1
c     b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨  b^{1, 975}_0
c  in DIMACS:
 4082  4083  4084  974  4085 0
 4082  4083  4084  974 -4086 0
 4082  4083  4084  974  4087 0

c  -1-1 --> -2
c    ( b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧  b^{1, 974}_0 ∧ -p_974) -> ( b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0)
c  in CNF:
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨  b^{1, 975}_2
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨  b^{1, 975}_1
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨  p_974 ∨ -b^{1, 975}_0
c  in DIMACS:
-4082  4083 -4084  974  4085 0
-4082  4083 -4084  974  4086 0
-4082  4083 -4084  974 -4087 0

c  -2-1 --> break 
c    ( b^{1, 974}_2 ∧  b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧ -p_974) -> break
c  in CNF:
c    -b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨  b^{1, 974}_0 ∨  p_974 ∨ break
c  in DIMACS:
-4082 -4083  4084  974 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 974}_2 ∧ -b^{1, 974}_1 ∧ -b^{1, 974}_0 ∧ true) 
c  in CNF:
c    -b^{1, 974}_2 ∨  b^{1, 974}_1 ∨  b^{1, 974}_0 ∨ false 
c  in DIMACS:
-4082  4083  4084  0

c  3 does not represent an automaton state.
c    -(-b^{1, 974}_2 ∧  b^{1, 974}_1 ∧  b^{1, 974}_0 ∧ true) 
c  in CNF:
c     b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ false 
c  in DIMACS:
 4082 -4083 -4084  0
c  -3 does not represent an automaton state.
c    -( b^{1, 974}_2 ∧  b^{1, 974}_1 ∧  b^{1, 974}_0 ∧ true) 
c  in CNF:
c    -b^{1, 974}_2 ∨ -b^{1, 974}_1 ∨ -b^{1, 974}_0 ∨ false 
c  in DIMACS:
-4082 -4083 -4084  0

c i = 975
c  -2+1 --> -1
c    ( b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧  p_975) -> ( b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0)
c  in CNF:
c    -b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨  b^{1, 976}_2
c    -b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_1
c    -b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨  b^{1, 976}_0
c  in DIMACS:
-4085 -4086  4087 -975  4088 0
-4085 -4086  4087 -975 -4089 0
-4085 -4086  4087 -975  4090 0

c  -1+1 --> 0
c    ( b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0 ∧  p_975) -> (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧ -b^{1, 976}_0)
c  in CNF:
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_2
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_1
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_0
c  in DIMACS:
-4085  4086 -4087 -975 -4088 0
-4085  4086 -4087 -975 -4089 0
-4085  4086 -4087 -975 -4090 0

c  0+1 --> 1
c    (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧  p_975) -> (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0)
c  in CNF:
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_2
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_1
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨  b^{1, 976}_0
c  in DIMACS:
 4085  4086  4087 -975 -4088 0
 4085  4086  4087 -975 -4089 0
 4085  4086  4087 -975  4090 0

c  1+1 --> 2
c    (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0 ∧  p_975) -> (-b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0)
c  in CNF:
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_2
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨  b^{1, 976}_1
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ -p_975 ∨ -b^{1, 976}_0
c  in DIMACS:
 4085  4086 -4087 -975 -4088 0
 4085  4086 -4087 -975  4089 0
 4085  4086 -4087 -975 -4090 0

c  2+1 --> break 
c    (-b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧  p_975) -> break
c  in CNF:
c     b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 4085 -4086  4087 -975 1162 0


c  2-1 --> 1
c    (-b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧ -p_975) -> (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0)
c  in CNF:
c     b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_2
c     b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_1
c     b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨  b^{1, 976}_0
c  in DIMACS:
 4085 -4086  4087  975 -4088 0
 4085 -4086  4087  975 -4089 0
 4085 -4086  4087  975  4090 0

c  1-1 --> 0
c    (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0 ∧ -p_975) -> (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧ -b^{1, 976}_0)
c  in CNF:
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_2
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_1
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_0
c  in DIMACS:
 4085  4086 -4087  975 -4088 0
 4085  4086 -4087  975 -4089 0
 4085  4086 -4087  975 -4090 0

c  0-1 --> -1
c    (-b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧ -p_975) -> ( b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0)
c  in CNF:
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨  b^{1, 976}_2
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_1
c     b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨  b^{1, 976}_0
c  in DIMACS:
 4085  4086  4087  975  4088 0
 4085  4086  4087  975 -4089 0
 4085  4086  4087  975  4090 0

c  -1-1 --> -2
c    ( b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧  b^{1, 975}_0 ∧ -p_975) -> ( b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0)
c  in CNF:
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨  b^{1, 976}_2
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨  b^{1, 976}_1
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨  p_975 ∨ -b^{1, 976}_0
c  in DIMACS:
-4085  4086 -4087  975  4088 0
-4085  4086 -4087  975  4089 0
-4085  4086 -4087  975 -4090 0

c  -2-1 --> break 
c    ( b^{1, 975}_2 ∧  b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨  b^{1, 975}_0 ∨  p_975 ∨ break
c  in DIMACS:
-4085 -4086  4087  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 975}_2 ∧ -b^{1, 975}_1 ∧ -b^{1, 975}_0 ∧ true) 
c  in CNF:
c    -b^{1, 975}_2 ∨  b^{1, 975}_1 ∨  b^{1, 975}_0 ∨ false 
c  in DIMACS:
-4085  4086  4087  0

c  3 does not represent an automaton state.
c    -(-b^{1, 975}_2 ∧  b^{1, 975}_1 ∧  b^{1, 975}_0 ∧ true) 
c  in CNF:
c     b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ false 
c  in DIMACS:
 4085 -4086 -4087  0
c  -3 does not represent an automaton state.
c    -( b^{1, 975}_2 ∧  b^{1, 975}_1 ∧  b^{1, 975}_0 ∧ true) 
c  in CNF:
c    -b^{1, 975}_2 ∨ -b^{1, 975}_1 ∨ -b^{1, 975}_0 ∨ false 
c  in DIMACS:
-4085 -4086 -4087  0

c i = 976
c  -2+1 --> -1
c    ( b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧  p_976) -> ( b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0)
c  in CNF:
c    -b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨  b^{1, 977}_2
c    -b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_1
c    -b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨  b^{1, 977}_0
c  in DIMACS:
-4088 -4089  4090 -976  4091 0
-4088 -4089  4090 -976 -4092 0
-4088 -4089  4090 -976  4093 0

c  -1+1 --> 0
c    ( b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0 ∧  p_976) -> (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧ -b^{1, 977}_0)
c  in CNF:
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_2
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_1
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_0
c  in DIMACS:
-4088  4089 -4090 -976 -4091 0
-4088  4089 -4090 -976 -4092 0
-4088  4089 -4090 -976 -4093 0

c  0+1 --> 1
c    (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧  p_976) -> (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0)
c  in CNF:
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_2
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_1
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨  b^{1, 977}_0
c  in DIMACS:
 4088  4089  4090 -976 -4091 0
 4088  4089  4090 -976 -4092 0
 4088  4089  4090 -976  4093 0

c  1+1 --> 2
c    (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0 ∧  p_976) -> (-b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0)
c  in CNF:
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_2
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨  b^{1, 977}_1
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ -p_976 ∨ -b^{1, 977}_0
c  in DIMACS:
 4088  4089 -4090 -976 -4091 0
 4088  4089 -4090 -976  4092 0
 4088  4089 -4090 -976 -4093 0

c  2+1 --> break 
c    (-b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧  p_976) -> break
c  in CNF:
c     b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 4088 -4089  4090 -976 1162 0


c  2-1 --> 1
c    (-b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧ -p_976) -> (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0)
c  in CNF:
c     b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_2
c     b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_1
c     b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨  b^{1, 977}_0
c  in DIMACS:
 4088 -4089  4090  976 -4091 0
 4088 -4089  4090  976 -4092 0
 4088 -4089  4090  976  4093 0

c  1-1 --> 0
c    (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0 ∧ -p_976) -> (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧ -b^{1, 977}_0)
c  in CNF:
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_2
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_1
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_0
c  in DIMACS:
 4088  4089 -4090  976 -4091 0
 4088  4089 -4090  976 -4092 0
 4088  4089 -4090  976 -4093 0

c  0-1 --> -1
c    (-b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧ -p_976) -> ( b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0)
c  in CNF:
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨  b^{1, 977}_2
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_1
c     b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨  b^{1, 977}_0
c  in DIMACS:
 4088  4089  4090  976  4091 0
 4088  4089  4090  976 -4092 0
 4088  4089  4090  976  4093 0

c  -1-1 --> -2
c    ( b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧  b^{1, 976}_0 ∧ -p_976) -> ( b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0)
c  in CNF:
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨  b^{1, 977}_2
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨  b^{1, 977}_1
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨  p_976 ∨ -b^{1, 977}_0
c  in DIMACS:
-4088  4089 -4090  976  4091 0
-4088  4089 -4090  976  4092 0
-4088  4089 -4090  976 -4093 0

c  -2-1 --> break 
c    ( b^{1, 976}_2 ∧  b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨  b^{1, 976}_0 ∨  p_976 ∨ break
c  in DIMACS:
-4088 -4089  4090  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 976}_2 ∧ -b^{1, 976}_1 ∧ -b^{1, 976}_0 ∧ true) 
c  in CNF:
c    -b^{1, 976}_2 ∨  b^{1, 976}_1 ∨  b^{1, 976}_0 ∨ false 
c  in DIMACS:
-4088  4089  4090  0

c  3 does not represent an automaton state.
c    -(-b^{1, 976}_2 ∧  b^{1, 976}_1 ∧  b^{1, 976}_0 ∧ true) 
c  in CNF:
c     b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ false 
c  in DIMACS:
 4088 -4089 -4090  0
c  -3 does not represent an automaton state.
c    -( b^{1, 976}_2 ∧  b^{1, 976}_1 ∧  b^{1, 976}_0 ∧ true) 
c  in CNF:
c    -b^{1, 976}_2 ∨ -b^{1, 976}_1 ∨ -b^{1, 976}_0 ∨ false 
c  in DIMACS:
-4088 -4089 -4090  0

c i = 977
c  -2+1 --> -1
c    ( b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧  p_977) -> ( b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0)
c  in CNF:
c    -b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨  b^{1, 978}_2
c    -b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_1
c    -b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨  b^{1, 978}_0
c  in DIMACS:
-4091 -4092  4093 -977  4094 0
-4091 -4092  4093 -977 -4095 0
-4091 -4092  4093 -977  4096 0

c  -1+1 --> 0
c    ( b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0 ∧  p_977) -> (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧ -b^{1, 978}_0)
c  in CNF:
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_2
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_1
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_0
c  in DIMACS:
-4091  4092 -4093 -977 -4094 0
-4091  4092 -4093 -977 -4095 0
-4091  4092 -4093 -977 -4096 0

c  0+1 --> 1
c    (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧  p_977) -> (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0)
c  in CNF:
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_2
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_1
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨  b^{1, 978}_0
c  in DIMACS:
 4091  4092  4093 -977 -4094 0
 4091  4092  4093 -977 -4095 0
 4091  4092  4093 -977  4096 0

c  1+1 --> 2
c    (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0 ∧  p_977) -> (-b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0)
c  in CNF:
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_2
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨  b^{1, 978}_1
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ -p_977 ∨ -b^{1, 978}_0
c  in DIMACS:
 4091  4092 -4093 -977 -4094 0
 4091  4092 -4093 -977  4095 0
 4091  4092 -4093 -977 -4096 0

c  2+1 --> break 
c    (-b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧  p_977) -> break
c  in CNF:
c     b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ -p_977 ∨ break
c  in DIMACS:
 4091 -4092  4093 -977 1162 0


c  2-1 --> 1
c    (-b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧ -p_977) -> (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0)
c  in CNF:
c     b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_2
c     b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_1
c     b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨  b^{1, 978}_0
c  in DIMACS:
 4091 -4092  4093  977 -4094 0
 4091 -4092  4093  977 -4095 0
 4091 -4092  4093  977  4096 0

c  1-1 --> 0
c    (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0 ∧ -p_977) -> (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧ -b^{1, 978}_0)
c  in CNF:
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_2
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_1
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_0
c  in DIMACS:
 4091  4092 -4093  977 -4094 0
 4091  4092 -4093  977 -4095 0
 4091  4092 -4093  977 -4096 0

c  0-1 --> -1
c    (-b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧ -p_977) -> ( b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0)
c  in CNF:
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨  b^{1, 978}_2
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_1
c     b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨  b^{1, 978}_0
c  in DIMACS:
 4091  4092  4093  977  4094 0
 4091  4092  4093  977 -4095 0
 4091  4092  4093  977  4096 0

c  -1-1 --> -2
c    ( b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧  b^{1, 977}_0 ∧ -p_977) -> ( b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0)
c  in CNF:
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨  b^{1, 978}_2
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨  b^{1, 978}_1
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨  p_977 ∨ -b^{1, 978}_0
c  in DIMACS:
-4091  4092 -4093  977  4094 0
-4091  4092 -4093  977  4095 0
-4091  4092 -4093  977 -4096 0

c  -2-1 --> break 
c    ( b^{1, 977}_2 ∧  b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧ -p_977) -> break
c  in CNF:
c    -b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨  b^{1, 977}_0 ∨  p_977 ∨ break
c  in DIMACS:
-4091 -4092  4093  977 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 977}_2 ∧ -b^{1, 977}_1 ∧ -b^{1, 977}_0 ∧ true) 
c  in CNF:
c    -b^{1, 977}_2 ∨  b^{1, 977}_1 ∨  b^{1, 977}_0 ∨ false 
c  in DIMACS:
-4091  4092  4093  0

c  3 does not represent an automaton state.
c    -(-b^{1, 977}_2 ∧  b^{1, 977}_1 ∧  b^{1, 977}_0 ∧ true) 
c  in CNF:
c     b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ false 
c  in DIMACS:
 4091 -4092 -4093  0
c  -3 does not represent an automaton state.
c    -( b^{1, 977}_2 ∧  b^{1, 977}_1 ∧  b^{1, 977}_0 ∧ true) 
c  in CNF:
c    -b^{1, 977}_2 ∨ -b^{1, 977}_1 ∨ -b^{1, 977}_0 ∨ false 
c  in DIMACS:
-4091 -4092 -4093  0

c i = 978
c  -2+1 --> -1
c    ( b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧  p_978) -> ( b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0)
c  in CNF:
c    -b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨  b^{1, 979}_2
c    -b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_1
c    -b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨  b^{1, 979}_0
c  in DIMACS:
-4094 -4095  4096 -978  4097 0
-4094 -4095  4096 -978 -4098 0
-4094 -4095  4096 -978  4099 0

c  -1+1 --> 0
c    ( b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0 ∧  p_978) -> (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧ -b^{1, 979}_0)
c  in CNF:
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_2
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_1
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_0
c  in DIMACS:
-4094  4095 -4096 -978 -4097 0
-4094  4095 -4096 -978 -4098 0
-4094  4095 -4096 -978 -4099 0

c  0+1 --> 1
c    (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧  p_978) -> (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0)
c  in CNF:
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_2
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_1
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨  b^{1, 979}_0
c  in DIMACS:
 4094  4095  4096 -978 -4097 0
 4094  4095  4096 -978 -4098 0
 4094  4095  4096 -978  4099 0

c  1+1 --> 2
c    (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0 ∧  p_978) -> (-b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0)
c  in CNF:
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_2
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨  b^{1, 979}_1
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ -p_978 ∨ -b^{1, 979}_0
c  in DIMACS:
 4094  4095 -4096 -978 -4097 0
 4094  4095 -4096 -978  4098 0
 4094  4095 -4096 -978 -4099 0

c  2+1 --> break 
c    (-b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧  p_978) -> break
c  in CNF:
c     b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 4094 -4095  4096 -978 1162 0


c  2-1 --> 1
c    (-b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧ -p_978) -> (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0)
c  in CNF:
c     b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_2
c     b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_1
c     b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨  b^{1, 979}_0
c  in DIMACS:
 4094 -4095  4096  978 -4097 0
 4094 -4095  4096  978 -4098 0
 4094 -4095  4096  978  4099 0

c  1-1 --> 0
c    (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0 ∧ -p_978) -> (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧ -b^{1, 979}_0)
c  in CNF:
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_2
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_1
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_0
c  in DIMACS:
 4094  4095 -4096  978 -4097 0
 4094  4095 -4096  978 -4098 0
 4094  4095 -4096  978 -4099 0

c  0-1 --> -1
c    (-b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧ -p_978) -> ( b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0)
c  in CNF:
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨  b^{1, 979}_2
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_1
c     b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨  b^{1, 979}_0
c  in DIMACS:
 4094  4095  4096  978  4097 0
 4094  4095  4096  978 -4098 0
 4094  4095  4096  978  4099 0

c  -1-1 --> -2
c    ( b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧  b^{1, 978}_0 ∧ -p_978) -> ( b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0)
c  in CNF:
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨  b^{1, 979}_2
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨  b^{1, 979}_1
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨  p_978 ∨ -b^{1, 979}_0
c  in DIMACS:
-4094  4095 -4096  978  4097 0
-4094  4095 -4096  978  4098 0
-4094  4095 -4096  978 -4099 0

c  -2-1 --> break 
c    ( b^{1, 978}_2 ∧  b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨  b^{1, 978}_0 ∨  p_978 ∨ break
c  in DIMACS:
-4094 -4095  4096  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 978}_2 ∧ -b^{1, 978}_1 ∧ -b^{1, 978}_0 ∧ true) 
c  in CNF:
c    -b^{1, 978}_2 ∨  b^{1, 978}_1 ∨  b^{1, 978}_0 ∨ false 
c  in DIMACS:
-4094  4095  4096  0

c  3 does not represent an automaton state.
c    -(-b^{1, 978}_2 ∧  b^{1, 978}_1 ∧  b^{1, 978}_0 ∧ true) 
c  in CNF:
c     b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ false 
c  in DIMACS:
 4094 -4095 -4096  0
c  -3 does not represent an automaton state.
c    -( b^{1, 978}_2 ∧  b^{1, 978}_1 ∧  b^{1, 978}_0 ∧ true) 
c  in CNF:
c    -b^{1, 978}_2 ∨ -b^{1, 978}_1 ∨ -b^{1, 978}_0 ∨ false 
c  in DIMACS:
-4094 -4095 -4096  0

c i = 979
c  -2+1 --> -1
c    ( b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧  p_979) -> ( b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0)
c  in CNF:
c    -b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨  b^{1, 980}_2
c    -b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_1
c    -b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨  b^{1, 980}_0
c  in DIMACS:
-4097 -4098  4099 -979  4100 0
-4097 -4098  4099 -979 -4101 0
-4097 -4098  4099 -979  4102 0

c  -1+1 --> 0
c    ( b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0 ∧  p_979) -> (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧ -b^{1, 980}_0)
c  in CNF:
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_2
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_1
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_0
c  in DIMACS:
-4097  4098 -4099 -979 -4100 0
-4097  4098 -4099 -979 -4101 0
-4097  4098 -4099 -979 -4102 0

c  0+1 --> 1
c    (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧  p_979) -> (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0)
c  in CNF:
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_2
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_1
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨  b^{1, 980}_0
c  in DIMACS:
 4097  4098  4099 -979 -4100 0
 4097  4098  4099 -979 -4101 0
 4097  4098  4099 -979  4102 0

c  1+1 --> 2
c    (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0 ∧  p_979) -> (-b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0)
c  in CNF:
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_2
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨  b^{1, 980}_1
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ -p_979 ∨ -b^{1, 980}_0
c  in DIMACS:
 4097  4098 -4099 -979 -4100 0
 4097  4098 -4099 -979  4101 0
 4097  4098 -4099 -979 -4102 0

c  2+1 --> break 
c    (-b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧  p_979) -> break
c  in CNF:
c     b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ -p_979 ∨ break
c  in DIMACS:
 4097 -4098  4099 -979 1162 0


c  2-1 --> 1
c    (-b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧ -p_979) -> (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0)
c  in CNF:
c     b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_2
c     b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_1
c     b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨  b^{1, 980}_0
c  in DIMACS:
 4097 -4098  4099  979 -4100 0
 4097 -4098  4099  979 -4101 0
 4097 -4098  4099  979  4102 0

c  1-1 --> 0
c    (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0 ∧ -p_979) -> (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧ -b^{1, 980}_0)
c  in CNF:
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_2
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_1
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_0
c  in DIMACS:
 4097  4098 -4099  979 -4100 0
 4097  4098 -4099  979 -4101 0
 4097  4098 -4099  979 -4102 0

c  0-1 --> -1
c    (-b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧ -p_979) -> ( b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0)
c  in CNF:
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨  b^{1, 980}_2
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_1
c     b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨  b^{1, 980}_0
c  in DIMACS:
 4097  4098  4099  979  4100 0
 4097  4098  4099  979 -4101 0
 4097  4098  4099  979  4102 0

c  -1-1 --> -2
c    ( b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧  b^{1, 979}_0 ∧ -p_979) -> ( b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0)
c  in CNF:
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨  b^{1, 980}_2
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨  b^{1, 980}_1
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨  p_979 ∨ -b^{1, 980}_0
c  in DIMACS:
-4097  4098 -4099  979  4100 0
-4097  4098 -4099  979  4101 0
-4097  4098 -4099  979 -4102 0

c  -2-1 --> break 
c    ( b^{1, 979}_2 ∧  b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧ -p_979) -> break
c  in CNF:
c    -b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨  b^{1, 979}_0 ∨  p_979 ∨ break
c  in DIMACS:
-4097 -4098  4099  979 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 979}_2 ∧ -b^{1, 979}_1 ∧ -b^{1, 979}_0 ∧ true) 
c  in CNF:
c    -b^{1, 979}_2 ∨  b^{1, 979}_1 ∨  b^{1, 979}_0 ∨ false 
c  in DIMACS:
-4097  4098  4099  0

c  3 does not represent an automaton state.
c    -(-b^{1, 979}_2 ∧  b^{1, 979}_1 ∧  b^{1, 979}_0 ∧ true) 
c  in CNF:
c     b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ false 
c  in DIMACS:
 4097 -4098 -4099  0
c  -3 does not represent an automaton state.
c    -( b^{1, 979}_2 ∧  b^{1, 979}_1 ∧  b^{1, 979}_0 ∧ true) 
c  in CNF:
c    -b^{1, 979}_2 ∨ -b^{1, 979}_1 ∨ -b^{1, 979}_0 ∨ false 
c  in DIMACS:
-4097 -4098 -4099  0

c i = 980
c  -2+1 --> -1
c    ( b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧  p_980) -> ( b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0)
c  in CNF:
c    -b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨  b^{1, 981}_2
c    -b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_1
c    -b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨  b^{1, 981}_0
c  in DIMACS:
-4100 -4101  4102 -980  4103 0
-4100 -4101  4102 -980 -4104 0
-4100 -4101  4102 -980  4105 0

c  -1+1 --> 0
c    ( b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0 ∧  p_980) -> (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧ -b^{1, 981}_0)
c  in CNF:
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_2
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_1
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_0
c  in DIMACS:
-4100  4101 -4102 -980 -4103 0
-4100  4101 -4102 -980 -4104 0
-4100  4101 -4102 -980 -4105 0

c  0+1 --> 1
c    (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧  p_980) -> (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0)
c  in CNF:
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_2
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_1
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨  b^{1, 981}_0
c  in DIMACS:
 4100  4101  4102 -980 -4103 0
 4100  4101  4102 -980 -4104 0
 4100  4101  4102 -980  4105 0

c  1+1 --> 2
c    (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0 ∧  p_980) -> (-b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0)
c  in CNF:
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_2
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨  b^{1, 981}_1
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ -p_980 ∨ -b^{1, 981}_0
c  in DIMACS:
 4100  4101 -4102 -980 -4103 0
 4100  4101 -4102 -980  4104 0
 4100  4101 -4102 -980 -4105 0

c  2+1 --> break 
c    (-b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧  p_980) -> break
c  in CNF:
c     b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 4100 -4101  4102 -980 1162 0


c  2-1 --> 1
c    (-b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧ -p_980) -> (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0)
c  in CNF:
c     b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_2
c     b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_1
c     b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨  b^{1, 981}_0
c  in DIMACS:
 4100 -4101  4102  980 -4103 0
 4100 -4101  4102  980 -4104 0
 4100 -4101  4102  980  4105 0

c  1-1 --> 0
c    (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0 ∧ -p_980) -> (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧ -b^{1, 981}_0)
c  in CNF:
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_2
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_1
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_0
c  in DIMACS:
 4100  4101 -4102  980 -4103 0
 4100  4101 -4102  980 -4104 0
 4100  4101 -4102  980 -4105 0

c  0-1 --> -1
c    (-b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧ -p_980) -> ( b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0)
c  in CNF:
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨  b^{1, 981}_2
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_1
c     b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨  b^{1, 981}_0
c  in DIMACS:
 4100  4101  4102  980  4103 0
 4100  4101  4102  980 -4104 0
 4100  4101  4102  980  4105 0

c  -1-1 --> -2
c    ( b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧  b^{1, 980}_0 ∧ -p_980) -> ( b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0)
c  in CNF:
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨  b^{1, 981}_2
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨  b^{1, 981}_1
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨  p_980 ∨ -b^{1, 981}_0
c  in DIMACS:
-4100  4101 -4102  980  4103 0
-4100  4101 -4102  980  4104 0
-4100  4101 -4102  980 -4105 0

c  -2-1 --> break 
c    ( b^{1, 980}_2 ∧  b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨  b^{1, 980}_0 ∨  p_980 ∨ break
c  in DIMACS:
-4100 -4101  4102  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 980}_2 ∧ -b^{1, 980}_1 ∧ -b^{1, 980}_0 ∧ true) 
c  in CNF:
c    -b^{1, 980}_2 ∨  b^{1, 980}_1 ∨  b^{1, 980}_0 ∨ false 
c  in DIMACS:
-4100  4101  4102  0

c  3 does not represent an automaton state.
c    -(-b^{1, 980}_2 ∧  b^{1, 980}_1 ∧  b^{1, 980}_0 ∧ true) 
c  in CNF:
c     b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ false 
c  in DIMACS:
 4100 -4101 -4102  0
c  -3 does not represent an automaton state.
c    -( b^{1, 980}_2 ∧  b^{1, 980}_1 ∧  b^{1, 980}_0 ∧ true) 
c  in CNF:
c    -b^{1, 980}_2 ∨ -b^{1, 980}_1 ∨ -b^{1, 980}_0 ∨ false 
c  in DIMACS:
-4100 -4101 -4102  0

c i = 981
c  -2+1 --> -1
c    ( b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧  p_981) -> ( b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0)
c  in CNF:
c    -b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨  b^{1, 982}_2
c    -b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_1
c    -b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨  b^{1, 982}_0
c  in DIMACS:
-4103 -4104  4105 -981  4106 0
-4103 -4104  4105 -981 -4107 0
-4103 -4104  4105 -981  4108 0

c  -1+1 --> 0
c    ( b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0 ∧  p_981) -> (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧ -b^{1, 982}_0)
c  in CNF:
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_2
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_1
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_0
c  in DIMACS:
-4103  4104 -4105 -981 -4106 0
-4103  4104 -4105 -981 -4107 0
-4103  4104 -4105 -981 -4108 0

c  0+1 --> 1
c    (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧  p_981) -> (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0)
c  in CNF:
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_2
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_1
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨  b^{1, 982}_0
c  in DIMACS:
 4103  4104  4105 -981 -4106 0
 4103  4104  4105 -981 -4107 0
 4103  4104  4105 -981  4108 0

c  1+1 --> 2
c    (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0 ∧  p_981) -> (-b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0)
c  in CNF:
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_2
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨  b^{1, 982}_1
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ -p_981 ∨ -b^{1, 982}_0
c  in DIMACS:
 4103  4104 -4105 -981 -4106 0
 4103  4104 -4105 -981  4107 0
 4103  4104 -4105 -981 -4108 0

c  2+1 --> break 
c    (-b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧  p_981) -> break
c  in CNF:
c     b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ -p_981 ∨ break
c  in DIMACS:
 4103 -4104  4105 -981 1162 0


c  2-1 --> 1
c    (-b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧ -p_981) -> (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0)
c  in CNF:
c     b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_2
c     b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_1
c     b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨  b^{1, 982}_0
c  in DIMACS:
 4103 -4104  4105  981 -4106 0
 4103 -4104  4105  981 -4107 0
 4103 -4104  4105  981  4108 0

c  1-1 --> 0
c    (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0 ∧ -p_981) -> (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧ -b^{1, 982}_0)
c  in CNF:
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_2
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_1
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_0
c  in DIMACS:
 4103  4104 -4105  981 -4106 0
 4103  4104 -4105  981 -4107 0
 4103  4104 -4105  981 -4108 0

c  0-1 --> -1
c    (-b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧ -p_981) -> ( b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0)
c  in CNF:
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨  b^{1, 982}_2
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_1
c     b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨  b^{1, 982}_0
c  in DIMACS:
 4103  4104  4105  981  4106 0
 4103  4104  4105  981 -4107 0
 4103  4104  4105  981  4108 0

c  -1-1 --> -2
c    ( b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧  b^{1, 981}_0 ∧ -p_981) -> ( b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0)
c  in CNF:
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨  b^{1, 982}_2
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨  b^{1, 982}_1
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨  p_981 ∨ -b^{1, 982}_0
c  in DIMACS:
-4103  4104 -4105  981  4106 0
-4103  4104 -4105  981  4107 0
-4103  4104 -4105  981 -4108 0

c  -2-1 --> break 
c    ( b^{1, 981}_2 ∧  b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧ -p_981) -> break
c  in CNF:
c    -b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨  b^{1, 981}_0 ∨  p_981 ∨ break
c  in DIMACS:
-4103 -4104  4105  981 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 981}_2 ∧ -b^{1, 981}_1 ∧ -b^{1, 981}_0 ∧ true) 
c  in CNF:
c    -b^{1, 981}_2 ∨  b^{1, 981}_1 ∨  b^{1, 981}_0 ∨ false 
c  in DIMACS:
-4103  4104  4105  0

c  3 does not represent an automaton state.
c    -(-b^{1, 981}_2 ∧  b^{1, 981}_1 ∧  b^{1, 981}_0 ∧ true) 
c  in CNF:
c     b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ false 
c  in DIMACS:
 4103 -4104 -4105  0
c  -3 does not represent an automaton state.
c    -( b^{1, 981}_2 ∧  b^{1, 981}_1 ∧  b^{1, 981}_0 ∧ true) 
c  in CNF:
c    -b^{1, 981}_2 ∨ -b^{1, 981}_1 ∨ -b^{1, 981}_0 ∨ false 
c  in DIMACS:
-4103 -4104 -4105  0

c i = 982
c  -2+1 --> -1
c    ( b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧  p_982) -> ( b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0)
c  in CNF:
c    -b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨  b^{1, 983}_2
c    -b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_1
c    -b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨  b^{1, 983}_0
c  in DIMACS:
-4106 -4107  4108 -982  4109 0
-4106 -4107  4108 -982 -4110 0
-4106 -4107  4108 -982  4111 0

c  -1+1 --> 0
c    ( b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0 ∧  p_982) -> (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧ -b^{1, 983}_0)
c  in CNF:
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_2
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_1
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_0
c  in DIMACS:
-4106  4107 -4108 -982 -4109 0
-4106  4107 -4108 -982 -4110 0
-4106  4107 -4108 -982 -4111 0

c  0+1 --> 1
c    (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧  p_982) -> (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0)
c  in CNF:
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_2
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_1
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨  b^{1, 983}_0
c  in DIMACS:
 4106  4107  4108 -982 -4109 0
 4106  4107  4108 -982 -4110 0
 4106  4107  4108 -982  4111 0

c  1+1 --> 2
c    (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0 ∧  p_982) -> (-b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0)
c  in CNF:
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_2
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨  b^{1, 983}_1
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ -p_982 ∨ -b^{1, 983}_0
c  in DIMACS:
 4106  4107 -4108 -982 -4109 0
 4106  4107 -4108 -982  4110 0
 4106  4107 -4108 -982 -4111 0

c  2+1 --> break 
c    (-b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧  p_982) -> break
c  in CNF:
c     b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ -p_982 ∨ break
c  in DIMACS:
 4106 -4107  4108 -982 1162 0


c  2-1 --> 1
c    (-b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧ -p_982) -> (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0)
c  in CNF:
c     b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_2
c     b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_1
c     b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨  b^{1, 983}_0
c  in DIMACS:
 4106 -4107  4108  982 -4109 0
 4106 -4107  4108  982 -4110 0
 4106 -4107  4108  982  4111 0

c  1-1 --> 0
c    (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0 ∧ -p_982) -> (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧ -b^{1, 983}_0)
c  in CNF:
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_2
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_1
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_0
c  in DIMACS:
 4106  4107 -4108  982 -4109 0
 4106  4107 -4108  982 -4110 0
 4106  4107 -4108  982 -4111 0

c  0-1 --> -1
c    (-b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧ -p_982) -> ( b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0)
c  in CNF:
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨  b^{1, 983}_2
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_1
c     b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨  b^{1, 983}_0
c  in DIMACS:
 4106  4107  4108  982  4109 0
 4106  4107  4108  982 -4110 0
 4106  4107  4108  982  4111 0

c  -1-1 --> -2
c    ( b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧  b^{1, 982}_0 ∧ -p_982) -> ( b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0)
c  in CNF:
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨  b^{1, 983}_2
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨  b^{1, 983}_1
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨  p_982 ∨ -b^{1, 983}_0
c  in DIMACS:
-4106  4107 -4108  982  4109 0
-4106  4107 -4108  982  4110 0
-4106  4107 -4108  982 -4111 0

c  -2-1 --> break 
c    ( b^{1, 982}_2 ∧  b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧ -p_982) -> break
c  in CNF:
c    -b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨  b^{1, 982}_0 ∨  p_982 ∨ break
c  in DIMACS:
-4106 -4107  4108  982 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 982}_2 ∧ -b^{1, 982}_1 ∧ -b^{1, 982}_0 ∧ true) 
c  in CNF:
c    -b^{1, 982}_2 ∨  b^{1, 982}_1 ∨  b^{1, 982}_0 ∨ false 
c  in DIMACS:
-4106  4107  4108  0

c  3 does not represent an automaton state.
c    -(-b^{1, 982}_2 ∧  b^{1, 982}_1 ∧  b^{1, 982}_0 ∧ true) 
c  in CNF:
c     b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ false 
c  in DIMACS:
 4106 -4107 -4108  0
c  -3 does not represent an automaton state.
c    -( b^{1, 982}_2 ∧  b^{1, 982}_1 ∧  b^{1, 982}_0 ∧ true) 
c  in CNF:
c    -b^{1, 982}_2 ∨ -b^{1, 982}_1 ∨ -b^{1, 982}_0 ∨ false 
c  in DIMACS:
-4106 -4107 -4108  0

c i = 983
c  -2+1 --> -1
c    ( b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧  p_983) -> ( b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0)
c  in CNF:
c    -b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨  b^{1, 984}_2
c    -b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_1
c    -b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨  b^{1, 984}_0
c  in DIMACS:
-4109 -4110  4111 -983  4112 0
-4109 -4110  4111 -983 -4113 0
-4109 -4110  4111 -983  4114 0

c  -1+1 --> 0
c    ( b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0 ∧  p_983) -> (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧ -b^{1, 984}_0)
c  in CNF:
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_2
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_1
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_0
c  in DIMACS:
-4109  4110 -4111 -983 -4112 0
-4109  4110 -4111 -983 -4113 0
-4109  4110 -4111 -983 -4114 0

c  0+1 --> 1
c    (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧  p_983) -> (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0)
c  in CNF:
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_2
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_1
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨  b^{1, 984}_0
c  in DIMACS:
 4109  4110  4111 -983 -4112 0
 4109  4110  4111 -983 -4113 0
 4109  4110  4111 -983  4114 0

c  1+1 --> 2
c    (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0 ∧  p_983) -> (-b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0)
c  in CNF:
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_2
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨  b^{1, 984}_1
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ -p_983 ∨ -b^{1, 984}_0
c  in DIMACS:
 4109  4110 -4111 -983 -4112 0
 4109  4110 -4111 -983  4113 0
 4109  4110 -4111 -983 -4114 0

c  2+1 --> break 
c    (-b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧  p_983) -> break
c  in CNF:
c     b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ -p_983 ∨ break
c  in DIMACS:
 4109 -4110  4111 -983 1162 0


c  2-1 --> 1
c    (-b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧ -p_983) -> (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0)
c  in CNF:
c     b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_2
c     b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_1
c     b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨  b^{1, 984}_0
c  in DIMACS:
 4109 -4110  4111  983 -4112 0
 4109 -4110  4111  983 -4113 0
 4109 -4110  4111  983  4114 0

c  1-1 --> 0
c    (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0 ∧ -p_983) -> (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧ -b^{1, 984}_0)
c  in CNF:
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_2
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_1
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_0
c  in DIMACS:
 4109  4110 -4111  983 -4112 0
 4109  4110 -4111  983 -4113 0
 4109  4110 -4111  983 -4114 0

c  0-1 --> -1
c    (-b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧ -p_983) -> ( b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0)
c  in CNF:
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨  b^{1, 984}_2
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_1
c     b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨  b^{1, 984}_0
c  in DIMACS:
 4109  4110  4111  983  4112 0
 4109  4110  4111  983 -4113 0
 4109  4110  4111  983  4114 0

c  -1-1 --> -2
c    ( b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧  b^{1, 983}_0 ∧ -p_983) -> ( b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0)
c  in CNF:
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨  b^{1, 984}_2
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨  b^{1, 984}_1
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨  p_983 ∨ -b^{1, 984}_0
c  in DIMACS:
-4109  4110 -4111  983  4112 0
-4109  4110 -4111  983  4113 0
-4109  4110 -4111  983 -4114 0

c  -2-1 --> break 
c    ( b^{1, 983}_2 ∧  b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧ -p_983) -> break
c  in CNF:
c    -b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨  b^{1, 983}_0 ∨  p_983 ∨ break
c  in DIMACS:
-4109 -4110  4111  983 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 983}_2 ∧ -b^{1, 983}_1 ∧ -b^{1, 983}_0 ∧ true) 
c  in CNF:
c    -b^{1, 983}_2 ∨  b^{1, 983}_1 ∨  b^{1, 983}_0 ∨ false 
c  in DIMACS:
-4109  4110  4111  0

c  3 does not represent an automaton state.
c    -(-b^{1, 983}_2 ∧  b^{1, 983}_1 ∧  b^{1, 983}_0 ∧ true) 
c  in CNF:
c     b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ false 
c  in DIMACS:
 4109 -4110 -4111  0
c  -3 does not represent an automaton state.
c    -( b^{1, 983}_2 ∧  b^{1, 983}_1 ∧  b^{1, 983}_0 ∧ true) 
c  in CNF:
c    -b^{1, 983}_2 ∨ -b^{1, 983}_1 ∨ -b^{1, 983}_0 ∨ false 
c  in DIMACS:
-4109 -4110 -4111  0

c i = 984
c  -2+1 --> -1
c    ( b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧  p_984) -> ( b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0)
c  in CNF:
c    -b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨  b^{1, 985}_2
c    -b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_1
c    -b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨  b^{1, 985}_0
c  in DIMACS:
-4112 -4113  4114 -984  4115 0
-4112 -4113  4114 -984 -4116 0
-4112 -4113  4114 -984  4117 0

c  -1+1 --> 0
c    ( b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0 ∧  p_984) -> (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧ -b^{1, 985}_0)
c  in CNF:
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_2
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_1
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_0
c  in DIMACS:
-4112  4113 -4114 -984 -4115 0
-4112  4113 -4114 -984 -4116 0
-4112  4113 -4114 -984 -4117 0

c  0+1 --> 1
c    (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧  p_984) -> (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0)
c  in CNF:
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_2
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_1
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨  b^{1, 985}_0
c  in DIMACS:
 4112  4113  4114 -984 -4115 0
 4112  4113  4114 -984 -4116 0
 4112  4113  4114 -984  4117 0

c  1+1 --> 2
c    (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0 ∧  p_984) -> (-b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0)
c  in CNF:
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_2
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨  b^{1, 985}_1
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ -p_984 ∨ -b^{1, 985}_0
c  in DIMACS:
 4112  4113 -4114 -984 -4115 0
 4112  4113 -4114 -984  4116 0
 4112  4113 -4114 -984 -4117 0

c  2+1 --> break 
c    (-b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧  p_984) -> break
c  in CNF:
c     b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 4112 -4113  4114 -984 1162 0


c  2-1 --> 1
c    (-b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧ -p_984) -> (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0)
c  in CNF:
c     b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_2
c     b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_1
c     b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨  b^{1, 985}_0
c  in DIMACS:
 4112 -4113  4114  984 -4115 0
 4112 -4113  4114  984 -4116 0
 4112 -4113  4114  984  4117 0

c  1-1 --> 0
c    (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0 ∧ -p_984) -> (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧ -b^{1, 985}_0)
c  in CNF:
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_2
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_1
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_0
c  in DIMACS:
 4112  4113 -4114  984 -4115 0
 4112  4113 -4114  984 -4116 0
 4112  4113 -4114  984 -4117 0

c  0-1 --> -1
c    (-b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧ -p_984) -> ( b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0)
c  in CNF:
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨  b^{1, 985}_2
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_1
c     b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨  b^{1, 985}_0
c  in DIMACS:
 4112  4113  4114  984  4115 0
 4112  4113  4114  984 -4116 0
 4112  4113  4114  984  4117 0

c  -1-1 --> -2
c    ( b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧  b^{1, 984}_0 ∧ -p_984) -> ( b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0)
c  in CNF:
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨  b^{1, 985}_2
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨  b^{1, 985}_1
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨  p_984 ∨ -b^{1, 985}_0
c  in DIMACS:
-4112  4113 -4114  984  4115 0
-4112  4113 -4114  984  4116 0
-4112  4113 -4114  984 -4117 0

c  -2-1 --> break 
c    ( b^{1, 984}_2 ∧  b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨  b^{1, 984}_0 ∨  p_984 ∨ break
c  in DIMACS:
-4112 -4113  4114  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 984}_2 ∧ -b^{1, 984}_1 ∧ -b^{1, 984}_0 ∧ true) 
c  in CNF:
c    -b^{1, 984}_2 ∨  b^{1, 984}_1 ∨  b^{1, 984}_0 ∨ false 
c  in DIMACS:
-4112  4113  4114  0

c  3 does not represent an automaton state.
c    -(-b^{1, 984}_2 ∧  b^{1, 984}_1 ∧  b^{1, 984}_0 ∧ true) 
c  in CNF:
c     b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ false 
c  in DIMACS:
 4112 -4113 -4114  0
c  -3 does not represent an automaton state.
c    -( b^{1, 984}_2 ∧  b^{1, 984}_1 ∧  b^{1, 984}_0 ∧ true) 
c  in CNF:
c    -b^{1, 984}_2 ∨ -b^{1, 984}_1 ∨ -b^{1, 984}_0 ∨ false 
c  in DIMACS:
-4112 -4113 -4114  0

c i = 985
c  -2+1 --> -1
c    ( b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧  p_985) -> ( b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0)
c  in CNF:
c    -b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨  b^{1, 986}_2
c    -b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_1
c    -b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨  b^{1, 986}_0
c  in DIMACS:
-4115 -4116  4117 -985  4118 0
-4115 -4116  4117 -985 -4119 0
-4115 -4116  4117 -985  4120 0

c  -1+1 --> 0
c    ( b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0 ∧  p_985) -> (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧ -b^{1, 986}_0)
c  in CNF:
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_2
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_1
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_0
c  in DIMACS:
-4115  4116 -4117 -985 -4118 0
-4115  4116 -4117 -985 -4119 0
-4115  4116 -4117 -985 -4120 0

c  0+1 --> 1
c    (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧  p_985) -> (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0)
c  in CNF:
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_2
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_1
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨  b^{1, 986}_0
c  in DIMACS:
 4115  4116  4117 -985 -4118 0
 4115  4116  4117 -985 -4119 0
 4115  4116  4117 -985  4120 0

c  1+1 --> 2
c    (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0 ∧  p_985) -> (-b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0)
c  in CNF:
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_2
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨  b^{1, 986}_1
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ -p_985 ∨ -b^{1, 986}_0
c  in DIMACS:
 4115  4116 -4117 -985 -4118 0
 4115  4116 -4117 -985  4119 0
 4115  4116 -4117 -985 -4120 0

c  2+1 --> break 
c    (-b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧  p_985) -> break
c  in CNF:
c     b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ -p_985 ∨ break
c  in DIMACS:
 4115 -4116  4117 -985 1162 0


c  2-1 --> 1
c    (-b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧ -p_985) -> (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0)
c  in CNF:
c     b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_2
c     b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_1
c     b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨  b^{1, 986}_0
c  in DIMACS:
 4115 -4116  4117  985 -4118 0
 4115 -4116  4117  985 -4119 0
 4115 -4116  4117  985  4120 0

c  1-1 --> 0
c    (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0 ∧ -p_985) -> (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧ -b^{1, 986}_0)
c  in CNF:
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_2
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_1
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_0
c  in DIMACS:
 4115  4116 -4117  985 -4118 0
 4115  4116 -4117  985 -4119 0
 4115  4116 -4117  985 -4120 0

c  0-1 --> -1
c    (-b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧ -p_985) -> ( b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0)
c  in CNF:
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨  b^{1, 986}_2
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_1
c     b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨  b^{1, 986}_0
c  in DIMACS:
 4115  4116  4117  985  4118 0
 4115  4116  4117  985 -4119 0
 4115  4116  4117  985  4120 0

c  -1-1 --> -2
c    ( b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧  b^{1, 985}_0 ∧ -p_985) -> ( b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0)
c  in CNF:
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨  b^{1, 986}_2
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨  b^{1, 986}_1
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨  p_985 ∨ -b^{1, 986}_0
c  in DIMACS:
-4115  4116 -4117  985  4118 0
-4115  4116 -4117  985  4119 0
-4115  4116 -4117  985 -4120 0

c  -2-1 --> break 
c    ( b^{1, 985}_2 ∧  b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧ -p_985) -> break
c  in CNF:
c    -b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨  b^{1, 985}_0 ∨  p_985 ∨ break
c  in DIMACS:
-4115 -4116  4117  985 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 985}_2 ∧ -b^{1, 985}_1 ∧ -b^{1, 985}_0 ∧ true) 
c  in CNF:
c    -b^{1, 985}_2 ∨  b^{1, 985}_1 ∨  b^{1, 985}_0 ∨ false 
c  in DIMACS:
-4115  4116  4117  0

c  3 does not represent an automaton state.
c    -(-b^{1, 985}_2 ∧  b^{1, 985}_1 ∧  b^{1, 985}_0 ∧ true) 
c  in CNF:
c     b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ false 
c  in DIMACS:
 4115 -4116 -4117  0
c  -3 does not represent an automaton state.
c    -( b^{1, 985}_2 ∧  b^{1, 985}_1 ∧  b^{1, 985}_0 ∧ true) 
c  in CNF:
c    -b^{1, 985}_2 ∨ -b^{1, 985}_1 ∨ -b^{1, 985}_0 ∨ false 
c  in DIMACS:
-4115 -4116 -4117  0

c i = 986
c  -2+1 --> -1
c    ( b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧  p_986) -> ( b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0)
c  in CNF:
c    -b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨  b^{1, 987}_2
c    -b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_1
c    -b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨  b^{1, 987}_0
c  in DIMACS:
-4118 -4119  4120 -986  4121 0
-4118 -4119  4120 -986 -4122 0
-4118 -4119  4120 -986  4123 0

c  -1+1 --> 0
c    ( b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0 ∧  p_986) -> (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧ -b^{1, 987}_0)
c  in CNF:
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_2
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_1
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_0
c  in DIMACS:
-4118  4119 -4120 -986 -4121 0
-4118  4119 -4120 -986 -4122 0
-4118  4119 -4120 -986 -4123 0

c  0+1 --> 1
c    (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧  p_986) -> (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0)
c  in CNF:
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_2
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_1
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨  b^{1, 987}_0
c  in DIMACS:
 4118  4119  4120 -986 -4121 0
 4118  4119  4120 -986 -4122 0
 4118  4119  4120 -986  4123 0

c  1+1 --> 2
c    (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0 ∧  p_986) -> (-b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0)
c  in CNF:
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_2
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨  b^{1, 987}_1
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ -p_986 ∨ -b^{1, 987}_0
c  in DIMACS:
 4118  4119 -4120 -986 -4121 0
 4118  4119 -4120 -986  4122 0
 4118  4119 -4120 -986 -4123 0

c  2+1 --> break 
c    (-b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧  p_986) -> break
c  in CNF:
c     b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 4118 -4119  4120 -986 1162 0


c  2-1 --> 1
c    (-b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧ -p_986) -> (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0)
c  in CNF:
c     b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_2
c     b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_1
c     b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨  b^{1, 987}_0
c  in DIMACS:
 4118 -4119  4120  986 -4121 0
 4118 -4119  4120  986 -4122 0
 4118 -4119  4120  986  4123 0

c  1-1 --> 0
c    (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0 ∧ -p_986) -> (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧ -b^{1, 987}_0)
c  in CNF:
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_2
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_1
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_0
c  in DIMACS:
 4118  4119 -4120  986 -4121 0
 4118  4119 -4120  986 -4122 0
 4118  4119 -4120  986 -4123 0

c  0-1 --> -1
c    (-b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧ -p_986) -> ( b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0)
c  in CNF:
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨  b^{1, 987}_2
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_1
c     b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨  b^{1, 987}_0
c  in DIMACS:
 4118  4119  4120  986  4121 0
 4118  4119  4120  986 -4122 0
 4118  4119  4120  986  4123 0

c  -1-1 --> -2
c    ( b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧  b^{1, 986}_0 ∧ -p_986) -> ( b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0)
c  in CNF:
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨  b^{1, 987}_2
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨  b^{1, 987}_1
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨  p_986 ∨ -b^{1, 987}_0
c  in DIMACS:
-4118  4119 -4120  986  4121 0
-4118  4119 -4120  986  4122 0
-4118  4119 -4120  986 -4123 0

c  -2-1 --> break 
c    ( b^{1, 986}_2 ∧  b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨  b^{1, 986}_0 ∨  p_986 ∨ break
c  in DIMACS:
-4118 -4119  4120  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 986}_2 ∧ -b^{1, 986}_1 ∧ -b^{1, 986}_0 ∧ true) 
c  in CNF:
c    -b^{1, 986}_2 ∨  b^{1, 986}_1 ∨  b^{1, 986}_0 ∨ false 
c  in DIMACS:
-4118  4119  4120  0

c  3 does not represent an automaton state.
c    -(-b^{1, 986}_2 ∧  b^{1, 986}_1 ∧  b^{1, 986}_0 ∧ true) 
c  in CNF:
c     b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ false 
c  in DIMACS:
 4118 -4119 -4120  0
c  -3 does not represent an automaton state.
c    -( b^{1, 986}_2 ∧  b^{1, 986}_1 ∧  b^{1, 986}_0 ∧ true) 
c  in CNF:
c    -b^{1, 986}_2 ∨ -b^{1, 986}_1 ∨ -b^{1, 986}_0 ∨ false 
c  in DIMACS:
-4118 -4119 -4120  0

c i = 987
c  -2+1 --> -1
c    ( b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧  p_987) -> ( b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0)
c  in CNF:
c    -b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨  b^{1, 988}_2
c    -b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_1
c    -b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨  b^{1, 988}_0
c  in DIMACS:
-4121 -4122  4123 -987  4124 0
-4121 -4122  4123 -987 -4125 0
-4121 -4122  4123 -987  4126 0

c  -1+1 --> 0
c    ( b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0 ∧  p_987) -> (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧ -b^{1, 988}_0)
c  in CNF:
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_2
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_1
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_0
c  in DIMACS:
-4121  4122 -4123 -987 -4124 0
-4121  4122 -4123 -987 -4125 0
-4121  4122 -4123 -987 -4126 0

c  0+1 --> 1
c    (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧  p_987) -> (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0)
c  in CNF:
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_2
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_1
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨  b^{1, 988}_0
c  in DIMACS:
 4121  4122  4123 -987 -4124 0
 4121  4122  4123 -987 -4125 0
 4121  4122  4123 -987  4126 0

c  1+1 --> 2
c    (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0 ∧  p_987) -> (-b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0)
c  in CNF:
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_2
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨  b^{1, 988}_1
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ -p_987 ∨ -b^{1, 988}_0
c  in DIMACS:
 4121  4122 -4123 -987 -4124 0
 4121  4122 -4123 -987  4125 0
 4121  4122 -4123 -987 -4126 0

c  2+1 --> break 
c    (-b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧  p_987) -> break
c  in CNF:
c     b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 4121 -4122  4123 -987 1162 0


c  2-1 --> 1
c    (-b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧ -p_987) -> (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0)
c  in CNF:
c     b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_2
c     b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_1
c     b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨  b^{1, 988}_0
c  in DIMACS:
 4121 -4122  4123  987 -4124 0
 4121 -4122  4123  987 -4125 0
 4121 -4122  4123  987  4126 0

c  1-1 --> 0
c    (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0 ∧ -p_987) -> (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧ -b^{1, 988}_0)
c  in CNF:
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_2
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_1
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_0
c  in DIMACS:
 4121  4122 -4123  987 -4124 0
 4121  4122 -4123  987 -4125 0
 4121  4122 -4123  987 -4126 0

c  0-1 --> -1
c    (-b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧ -p_987) -> ( b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0)
c  in CNF:
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨  b^{1, 988}_2
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_1
c     b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨  b^{1, 988}_0
c  in DIMACS:
 4121  4122  4123  987  4124 0
 4121  4122  4123  987 -4125 0
 4121  4122  4123  987  4126 0

c  -1-1 --> -2
c    ( b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧  b^{1, 987}_0 ∧ -p_987) -> ( b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0)
c  in CNF:
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨  b^{1, 988}_2
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨  b^{1, 988}_1
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨  p_987 ∨ -b^{1, 988}_0
c  in DIMACS:
-4121  4122 -4123  987  4124 0
-4121  4122 -4123  987  4125 0
-4121  4122 -4123  987 -4126 0

c  -2-1 --> break 
c    ( b^{1, 987}_2 ∧  b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨  b^{1, 987}_0 ∨  p_987 ∨ break
c  in DIMACS:
-4121 -4122  4123  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 987}_2 ∧ -b^{1, 987}_1 ∧ -b^{1, 987}_0 ∧ true) 
c  in CNF:
c    -b^{1, 987}_2 ∨  b^{1, 987}_1 ∨  b^{1, 987}_0 ∨ false 
c  in DIMACS:
-4121  4122  4123  0

c  3 does not represent an automaton state.
c    -(-b^{1, 987}_2 ∧  b^{1, 987}_1 ∧  b^{1, 987}_0 ∧ true) 
c  in CNF:
c     b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ false 
c  in DIMACS:
 4121 -4122 -4123  0
c  -3 does not represent an automaton state.
c    -( b^{1, 987}_2 ∧  b^{1, 987}_1 ∧  b^{1, 987}_0 ∧ true) 
c  in CNF:
c    -b^{1, 987}_2 ∨ -b^{1, 987}_1 ∨ -b^{1, 987}_0 ∨ false 
c  in DIMACS:
-4121 -4122 -4123  0

c i = 988
c  -2+1 --> -1
c    ( b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧  p_988) -> ( b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0)
c  in CNF:
c    -b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨  b^{1, 989}_2
c    -b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_1
c    -b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨  b^{1, 989}_0
c  in DIMACS:
-4124 -4125  4126 -988  4127 0
-4124 -4125  4126 -988 -4128 0
-4124 -4125  4126 -988  4129 0

c  -1+1 --> 0
c    ( b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0 ∧  p_988) -> (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧ -b^{1, 989}_0)
c  in CNF:
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_2
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_1
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_0
c  in DIMACS:
-4124  4125 -4126 -988 -4127 0
-4124  4125 -4126 -988 -4128 0
-4124  4125 -4126 -988 -4129 0

c  0+1 --> 1
c    (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧  p_988) -> (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0)
c  in CNF:
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_2
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_1
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨  b^{1, 989}_0
c  in DIMACS:
 4124  4125  4126 -988 -4127 0
 4124  4125  4126 -988 -4128 0
 4124  4125  4126 -988  4129 0

c  1+1 --> 2
c    (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0 ∧  p_988) -> (-b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0)
c  in CNF:
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_2
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨  b^{1, 989}_1
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ -p_988 ∨ -b^{1, 989}_0
c  in DIMACS:
 4124  4125 -4126 -988 -4127 0
 4124  4125 -4126 -988  4128 0
 4124  4125 -4126 -988 -4129 0

c  2+1 --> break 
c    (-b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧  p_988) -> break
c  in CNF:
c     b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 4124 -4125  4126 -988 1162 0


c  2-1 --> 1
c    (-b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧ -p_988) -> (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0)
c  in CNF:
c     b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_2
c     b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_1
c     b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨  b^{1, 989}_0
c  in DIMACS:
 4124 -4125  4126  988 -4127 0
 4124 -4125  4126  988 -4128 0
 4124 -4125  4126  988  4129 0

c  1-1 --> 0
c    (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0 ∧ -p_988) -> (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧ -b^{1, 989}_0)
c  in CNF:
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_2
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_1
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_0
c  in DIMACS:
 4124  4125 -4126  988 -4127 0
 4124  4125 -4126  988 -4128 0
 4124  4125 -4126  988 -4129 0

c  0-1 --> -1
c    (-b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧ -p_988) -> ( b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0)
c  in CNF:
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨  b^{1, 989}_2
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_1
c     b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨  b^{1, 989}_0
c  in DIMACS:
 4124  4125  4126  988  4127 0
 4124  4125  4126  988 -4128 0
 4124  4125  4126  988  4129 0

c  -1-1 --> -2
c    ( b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧  b^{1, 988}_0 ∧ -p_988) -> ( b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0)
c  in CNF:
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨  b^{1, 989}_2
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨  b^{1, 989}_1
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨  p_988 ∨ -b^{1, 989}_0
c  in DIMACS:
-4124  4125 -4126  988  4127 0
-4124  4125 -4126  988  4128 0
-4124  4125 -4126  988 -4129 0

c  -2-1 --> break 
c    ( b^{1, 988}_2 ∧  b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨  b^{1, 988}_0 ∨  p_988 ∨ break
c  in DIMACS:
-4124 -4125  4126  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 988}_2 ∧ -b^{1, 988}_1 ∧ -b^{1, 988}_0 ∧ true) 
c  in CNF:
c    -b^{1, 988}_2 ∨  b^{1, 988}_1 ∨  b^{1, 988}_0 ∨ false 
c  in DIMACS:
-4124  4125  4126  0

c  3 does not represent an automaton state.
c    -(-b^{1, 988}_2 ∧  b^{1, 988}_1 ∧  b^{1, 988}_0 ∧ true) 
c  in CNF:
c     b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ false 
c  in DIMACS:
 4124 -4125 -4126  0
c  -3 does not represent an automaton state.
c    -( b^{1, 988}_2 ∧  b^{1, 988}_1 ∧  b^{1, 988}_0 ∧ true) 
c  in CNF:
c    -b^{1, 988}_2 ∨ -b^{1, 988}_1 ∨ -b^{1, 988}_0 ∨ false 
c  in DIMACS:
-4124 -4125 -4126  0

c i = 989
c  -2+1 --> -1
c    ( b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧  p_989) -> ( b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0)
c  in CNF:
c    -b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨  b^{1, 990}_2
c    -b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_1
c    -b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨  b^{1, 990}_0
c  in DIMACS:
-4127 -4128  4129 -989  4130 0
-4127 -4128  4129 -989 -4131 0
-4127 -4128  4129 -989  4132 0

c  -1+1 --> 0
c    ( b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0 ∧  p_989) -> (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧ -b^{1, 990}_0)
c  in CNF:
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_2
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_1
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_0
c  in DIMACS:
-4127  4128 -4129 -989 -4130 0
-4127  4128 -4129 -989 -4131 0
-4127  4128 -4129 -989 -4132 0

c  0+1 --> 1
c    (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧  p_989) -> (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0)
c  in CNF:
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_2
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_1
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨  b^{1, 990}_0
c  in DIMACS:
 4127  4128  4129 -989 -4130 0
 4127  4128  4129 -989 -4131 0
 4127  4128  4129 -989  4132 0

c  1+1 --> 2
c    (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0 ∧  p_989) -> (-b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0)
c  in CNF:
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_2
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨  b^{1, 990}_1
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ -p_989 ∨ -b^{1, 990}_0
c  in DIMACS:
 4127  4128 -4129 -989 -4130 0
 4127  4128 -4129 -989  4131 0
 4127  4128 -4129 -989 -4132 0

c  2+1 --> break 
c    (-b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧  p_989) -> break
c  in CNF:
c     b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ -p_989 ∨ break
c  in DIMACS:
 4127 -4128  4129 -989 1162 0


c  2-1 --> 1
c    (-b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧ -p_989) -> (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0)
c  in CNF:
c     b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_2
c     b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_1
c     b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨  b^{1, 990}_0
c  in DIMACS:
 4127 -4128  4129  989 -4130 0
 4127 -4128  4129  989 -4131 0
 4127 -4128  4129  989  4132 0

c  1-1 --> 0
c    (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0 ∧ -p_989) -> (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧ -b^{1, 990}_0)
c  in CNF:
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_2
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_1
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_0
c  in DIMACS:
 4127  4128 -4129  989 -4130 0
 4127  4128 -4129  989 -4131 0
 4127  4128 -4129  989 -4132 0

c  0-1 --> -1
c    (-b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧ -p_989) -> ( b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0)
c  in CNF:
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨  b^{1, 990}_2
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_1
c     b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨  b^{1, 990}_0
c  in DIMACS:
 4127  4128  4129  989  4130 0
 4127  4128  4129  989 -4131 0
 4127  4128  4129  989  4132 0

c  -1-1 --> -2
c    ( b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧  b^{1, 989}_0 ∧ -p_989) -> ( b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0)
c  in CNF:
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨  b^{1, 990}_2
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨  b^{1, 990}_1
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨  p_989 ∨ -b^{1, 990}_0
c  in DIMACS:
-4127  4128 -4129  989  4130 0
-4127  4128 -4129  989  4131 0
-4127  4128 -4129  989 -4132 0

c  -2-1 --> break 
c    ( b^{1, 989}_2 ∧  b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧ -p_989) -> break
c  in CNF:
c    -b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨  b^{1, 989}_0 ∨  p_989 ∨ break
c  in DIMACS:
-4127 -4128  4129  989 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 989}_2 ∧ -b^{1, 989}_1 ∧ -b^{1, 989}_0 ∧ true) 
c  in CNF:
c    -b^{1, 989}_2 ∨  b^{1, 989}_1 ∨  b^{1, 989}_0 ∨ false 
c  in DIMACS:
-4127  4128  4129  0

c  3 does not represent an automaton state.
c    -(-b^{1, 989}_2 ∧  b^{1, 989}_1 ∧  b^{1, 989}_0 ∧ true) 
c  in CNF:
c     b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ false 
c  in DIMACS:
 4127 -4128 -4129  0
c  -3 does not represent an automaton state.
c    -( b^{1, 989}_2 ∧  b^{1, 989}_1 ∧  b^{1, 989}_0 ∧ true) 
c  in CNF:
c    -b^{1, 989}_2 ∨ -b^{1, 989}_1 ∨ -b^{1, 989}_0 ∨ false 
c  in DIMACS:
-4127 -4128 -4129  0

c i = 990
c  -2+1 --> -1
c    ( b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧  p_990) -> ( b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0)
c  in CNF:
c    -b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨  b^{1, 991}_2
c    -b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_1
c    -b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨  b^{1, 991}_0
c  in DIMACS:
-4130 -4131  4132 -990  4133 0
-4130 -4131  4132 -990 -4134 0
-4130 -4131  4132 -990  4135 0

c  -1+1 --> 0
c    ( b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0 ∧  p_990) -> (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧ -b^{1, 991}_0)
c  in CNF:
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_2
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_1
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_0
c  in DIMACS:
-4130  4131 -4132 -990 -4133 0
-4130  4131 -4132 -990 -4134 0
-4130  4131 -4132 -990 -4135 0

c  0+1 --> 1
c    (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧  p_990) -> (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0)
c  in CNF:
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_2
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_1
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨  b^{1, 991}_0
c  in DIMACS:
 4130  4131  4132 -990 -4133 0
 4130  4131  4132 -990 -4134 0
 4130  4131  4132 -990  4135 0

c  1+1 --> 2
c    (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0 ∧  p_990) -> (-b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0)
c  in CNF:
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_2
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨  b^{1, 991}_1
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ -p_990 ∨ -b^{1, 991}_0
c  in DIMACS:
 4130  4131 -4132 -990 -4133 0
 4130  4131 -4132 -990  4134 0
 4130  4131 -4132 -990 -4135 0

c  2+1 --> break 
c    (-b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧  p_990) -> break
c  in CNF:
c     b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 4130 -4131  4132 -990 1162 0


c  2-1 --> 1
c    (-b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧ -p_990) -> (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0)
c  in CNF:
c     b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_2
c     b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_1
c     b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨  b^{1, 991}_0
c  in DIMACS:
 4130 -4131  4132  990 -4133 0
 4130 -4131  4132  990 -4134 0
 4130 -4131  4132  990  4135 0

c  1-1 --> 0
c    (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0 ∧ -p_990) -> (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧ -b^{1, 991}_0)
c  in CNF:
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_2
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_1
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_0
c  in DIMACS:
 4130  4131 -4132  990 -4133 0
 4130  4131 -4132  990 -4134 0
 4130  4131 -4132  990 -4135 0

c  0-1 --> -1
c    (-b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧ -p_990) -> ( b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0)
c  in CNF:
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨  b^{1, 991}_2
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_1
c     b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨  b^{1, 991}_0
c  in DIMACS:
 4130  4131  4132  990  4133 0
 4130  4131  4132  990 -4134 0
 4130  4131  4132  990  4135 0

c  -1-1 --> -2
c    ( b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧  b^{1, 990}_0 ∧ -p_990) -> ( b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0)
c  in CNF:
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨  b^{1, 991}_2
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨  b^{1, 991}_1
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨  p_990 ∨ -b^{1, 991}_0
c  in DIMACS:
-4130  4131 -4132  990  4133 0
-4130  4131 -4132  990  4134 0
-4130  4131 -4132  990 -4135 0

c  -2-1 --> break 
c    ( b^{1, 990}_2 ∧  b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨  b^{1, 990}_0 ∨  p_990 ∨ break
c  in DIMACS:
-4130 -4131  4132  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 990}_2 ∧ -b^{1, 990}_1 ∧ -b^{1, 990}_0 ∧ true) 
c  in CNF:
c    -b^{1, 990}_2 ∨  b^{1, 990}_1 ∨  b^{1, 990}_0 ∨ false 
c  in DIMACS:
-4130  4131  4132  0

c  3 does not represent an automaton state.
c    -(-b^{1, 990}_2 ∧  b^{1, 990}_1 ∧  b^{1, 990}_0 ∧ true) 
c  in CNF:
c     b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ false 
c  in DIMACS:
 4130 -4131 -4132  0
c  -3 does not represent an automaton state.
c    -( b^{1, 990}_2 ∧  b^{1, 990}_1 ∧  b^{1, 990}_0 ∧ true) 
c  in CNF:
c    -b^{1, 990}_2 ∨ -b^{1, 990}_1 ∨ -b^{1, 990}_0 ∨ false 
c  in DIMACS:
-4130 -4131 -4132  0

c i = 991
c  -2+1 --> -1
c    ( b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧  p_991) -> ( b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0)
c  in CNF:
c    -b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨  b^{1, 992}_2
c    -b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_1
c    -b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨  b^{1, 992}_0
c  in DIMACS:
-4133 -4134  4135 -991  4136 0
-4133 -4134  4135 -991 -4137 0
-4133 -4134  4135 -991  4138 0

c  -1+1 --> 0
c    ( b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0 ∧  p_991) -> (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧ -b^{1, 992}_0)
c  in CNF:
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_2
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_1
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_0
c  in DIMACS:
-4133  4134 -4135 -991 -4136 0
-4133  4134 -4135 -991 -4137 0
-4133  4134 -4135 -991 -4138 0

c  0+1 --> 1
c    (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧  p_991) -> (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0)
c  in CNF:
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_2
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_1
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨  b^{1, 992}_0
c  in DIMACS:
 4133  4134  4135 -991 -4136 0
 4133  4134  4135 -991 -4137 0
 4133  4134  4135 -991  4138 0

c  1+1 --> 2
c    (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0 ∧  p_991) -> (-b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0)
c  in CNF:
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_2
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨  b^{1, 992}_1
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ -p_991 ∨ -b^{1, 992}_0
c  in DIMACS:
 4133  4134 -4135 -991 -4136 0
 4133  4134 -4135 -991  4137 0
 4133  4134 -4135 -991 -4138 0

c  2+1 --> break 
c    (-b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧  p_991) -> break
c  in CNF:
c     b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ -p_991 ∨ break
c  in DIMACS:
 4133 -4134  4135 -991 1162 0


c  2-1 --> 1
c    (-b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧ -p_991) -> (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0)
c  in CNF:
c     b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_2
c     b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_1
c     b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨  b^{1, 992}_0
c  in DIMACS:
 4133 -4134  4135  991 -4136 0
 4133 -4134  4135  991 -4137 0
 4133 -4134  4135  991  4138 0

c  1-1 --> 0
c    (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0 ∧ -p_991) -> (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧ -b^{1, 992}_0)
c  in CNF:
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_2
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_1
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_0
c  in DIMACS:
 4133  4134 -4135  991 -4136 0
 4133  4134 -4135  991 -4137 0
 4133  4134 -4135  991 -4138 0

c  0-1 --> -1
c    (-b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧ -p_991) -> ( b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0)
c  in CNF:
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨  b^{1, 992}_2
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_1
c     b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨  b^{1, 992}_0
c  in DIMACS:
 4133  4134  4135  991  4136 0
 4133  4134  4135  991 -4137 0
 4133  4134  4135  991  4138 0

c  -1-1 --> -2
c    ( b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧  b^{1, 991}_0 ∧ -p_991) -> ( b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0)
c  in CNF:
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨  b^{1, 992}_2
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨  b^{1, 992}_1
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨  p_991 ∨ -b^{1, 992}_0
c  in DIMACS:
-4133  4134 -4135  991  4136 0
-4133  4134 -4135  991  4137 0
-4133  4134 -4135  991 -4138 0

c  -2-1 --> break 
c    ( b^{1, 991}_2 ∧  b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧ -p_991) -> break
c  in CNF:
c    -b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨  b^{1, 991}_0 ∨  p_991 ∨ break
c  in DIMACS:
-4133 -4134  4135  991 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 991}_2 ∧ -b^{1, 991}_1 ∧ -b^{1, 991}_0 ∧ true) 
c  in CNF:
c    -b^{1, 991}_2 ∨  b^{1, 991}_1 ∨  b^{1, 991}_0 ∨ false 
c  in DIMACS:
-4133  4134  4135  0

c  3 does not represent an automaton state.
c    -(-b^{1, 991}_2 ∧  b^{1, 991}_1 ∧  b^{1, 991}_0 ∧ true) 
c  in CNF:
c     b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ false 
c  in DIMACS:
 4133 -4134 -4135  0
c  -3 does not represent an automaton state.
c    -( b^{1, 991}_2 ∧  b^{1, 991}_1 ∧  b^{1, 991}_0 ∧ true) 
c  in CNF:
c    -b^{1, 991}_2 ∨ -b^{1, 991}_1 ∨ -b^{1, 991}_0 ∨ false 
c  in DIMACS:
-4133 -4134 -4135  0

c i = 992
c  -2+1 --> -1
c    ( b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧  p_992) -> ( b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0)
c  in CNF:
c    -b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨  b^{1, 993}_2
c    -b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_1
c    -b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨  b^{1, 993}_0
c  in DIMACS:
-4136 -4137  4138 -992  4139 0
-4136 -4137  4138 -992 -4140 0
-4136 -4137  4138 -992  4141 0

c  -1+1 --> 0
c    ( b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0 ∧  p_992) -> (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧ -b^{1, 993}_0)
c  in CNF:
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_2
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_1
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_0
c  in DIMACS:
-4136  4137 -4138 -992 -4139 0
-4136  4137 -4138 -992 -4140 0
-4136  4137 -4138 -992 -4141 0

c  0+1 --> 1
c    (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧  p_992) -> (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0)
c  in CNF:
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_2
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_1
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨  b^{1, 993}_0
c  in DIMACS:
 4136  4137  4138 -992 -4139 0
 4136  4137  4138 -992 -4140 0
 4136  4137  4138 -992  4141 0

c  1+1 --> 2
c    (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0 ∧  p_992) -> (-b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0)
c  in CNF:
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_2
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨  b^{1, 993}_1
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ -p_992 ∨ -b^{1, 993}_0
c  in DIMACS:
 4136  4137 -4138 -992 -4139 0
 4136  4137 -4138 -992  4140 0
 4136  4137 -4138 -992 -4141 0

c  2+1 --> break 
c    (-b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧  p_992) -> break
c  in CNF:
c     b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 4136 -4137  4138 -992 1162 0


c  2-1 --> 1
c    (-b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧ -p_992) -> (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0)
c  in CNF:
c     b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_2
c     b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_1
c     b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨  b^{1, 993}_0
c  in DIMACS:
 4136 -4137  4138  992 -4139 0
 4136 -4137  4138  992 -4140 0
 4136 -4137  4138  992  4141 0

c  1-1 --> 0
c    (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0 ∧ -p_992) -> (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧ -b^{1, 993}_0)
c  in CNF:
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_2
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_1
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_0
c  in DIMACS:
 4136  4137 -4138  992 -4139 0
 4136  4137 -4138  992 -4140 0
 4136  4137 -4138  992 -4141 0

c  0-1 --> -1
c    (-b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧ -p_992) -> ( b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0)
c  in CNF:
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨  b^{1, 993}_2
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_1
c     b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨  b^{1, 993}_0
c  in DIMACS:
 4136  4137  4138  992  4139 0
 4136  4137  4138  992 -4140 0
 4136  4137  4138  992  4141 0

c  -1-1 --> -2
c    ( b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧  b^{1, 992}_0 ∧ -p_992) -> ( b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0)
c  in CNF:
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨  b^{1, 993}_2
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨  b^{1, 993}_1
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨  p_992 ∨ -b^{1, 993}_0
c  in DIMACS:
-4136  4137 -4138  992  4139 0
-4136  4137 -4138  992  4140 0
-4136  4137 -4138  992 -4141 0

c  -2-1 --> break 
c    ( b^{1, 992}_2 ∧  b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨  b^{1, 992}_0 ∨  p_992 ∨ break
c  in DIMACS:
-4136 -4137  4138  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 992}_2 ∧ -b^{1, 992}_1 ∧ -b^{1, 992}_0 ∧ true) 
c  in CNF:
c    -b^{1, 992}_2 ∨  b^{1, 992}_1 ∨  b^{1, 992}_0 ∨ false 
c  in DIMACS:
-4136  4137  4138  0

c  3 does not represent an automaton state.
c    -(-b^{1, 992}_2 ∧  b^{1, 992}_1 ∧  b^{1, 992}_0 ∧ true) 
c  in CNF:
c     b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ false 
c  in DIMACS:
 4136 -4137 -4138  0
c  -3 does not represent an automaton state.
c    -( b^{1, 992}_2 ∧  b^{1, 992}_1 ∧  b^{1, 992}_0 ∧ true) 
c  in CNF:
c    -b^{1, 992}_2 ∨ -b^{1, 992}_1 ∨ -b^{1, 992}_0 ∨ false 
c  in DIMACS:
-4136 -4137 -4138  0

c i = 993
c  -2+1 --> -1
c    ( b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧  p_993) -> ( b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0)
c  in CNF:
c    -b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨  b^{1, 994}_2
c    -b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_1
c    -b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨  b^{1, 994}_0
c  in DIMACS:
-4139 -4140  4141 -993  4142 0
-4139 -4140  4141 -993 -4143 0
-4139 -4140  4141 -993  4144 0

c  -1+1 --> 0
c    ( b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0 ∧  p_993) -> (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧ -b^{1, 994}_0)
c  in CNF:
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_2
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_1
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_0
c  in DIMACS:
-4139  4140 -4141 -993 -4142 0
-4139  4140 -4141 -993 -4143 0
-4139  4140 -4141 -993 -4144 0

c  0+1 --> 1
c    (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧  p_993) -> (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0)
c  in CNF:
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_2
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_1
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨  b^{1, 994}_0
c  in DIMACS:
 4139  4140  4141 -993 -4142 0
 4139  4140  4141 -993 -4143 0
 4139  4140  4141 -993  4144 0

c  1+1 --> 2
c    (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0 ∧  p_993) -> (-b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0)
c  in CNF:
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_2
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨  b^{1, 994}_1
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ -p_993 ∨ -b^{1, 994}_0
c  in DIMACS:
 4139  4140 -4141 -993 -4142 0
 4139  4140 -4141 -993  4143 0
 4139  4140 -4141 -993 -4144 0

c  2+1 --> break 
c    (-b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧  p_993) -> break
c  in CNF:
c     b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ -p_993 ∨ break
c  in DIMACS:
 4139 -4140  4141 -993 1162 0


c  2-1 --> 1
c    (-b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧ -p_993) -> (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0)
c  in CNF:
c     b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_2
c     b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_1
c     b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨  b^{1, 994}_0
c  in DIMACS:
 4139 -4140  4141  993 -4142 0
 4139 -4140  4141  993 -4143 0
 4139 -4140  4141  993  4144 0

c  1-1 --> 0
c    (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0 ∧ -p_993) -> (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧ -b^{1, 994}_0)
c  in CNF:
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_2
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_1
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_0
c  in DIMACS:
 4139  4140 -4141  993 -4142 0
 4139  4140 -4141  993 -4143 0
 4139  4140 -4141  993 -4144 0

c  0-1 --> -1
c    (-b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧ -p_993) -> ( b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0)
c  in CNF:
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨  b^{1, 994}_2
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_1
c     b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨  b^{1, 994}_0
c  in DIMACS:
 4139  4140  4141  993  4142 0
 4139  4140  4141  993 -4143 0
 4139  4140  4141  993  4144 0

c  -1-1 --> -2
c    ( b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧  b^{1, 993}_0 ∧ -p_993) -> ( b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0)
c  in CNF:
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨  b^{1, 994}_2
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨  b^{1, 994}_1
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨  p_993 ∨ -b^{1, 994}_0
c  in DIMACS:
-4139  4140 -4141  993  4142 0
-4139  4140 -4141  993  4143 0
-4139  4140 -4141  993 -4144 0

c  -2-1 --> break 
c    ( b^{1, 993}_2 ∧  b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧ -p_993) -> break
c  in CNF:
c    -b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨  b^{1, 993}_0 ∨  p_993 ∨ break
c  in DIMACS:
-4139 -4140  4141  993 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 993}_2 ∧ -b^{1, 993}_1 ∧ -b^{1, 993}_0 ∧ true) 
c  in CNF:
c    -b^{1, 993}_2 ∨  b^{1, 993}_1 ∨  b^{1, 993}_0 ∨ false 
c  in DIMACS:
-4139  4140  4141  0

c  3 does not represent an automaton state.
c    -(-b^{1, 993}_2 ∧  b^{1, 993}_1 ∧  b^{1, 993}_0 ∧ true) 
c  in CNF:
c     b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ false 
c  in DIMACS:
 4139 -4140 -4141  0
c  -3 does not represent an automaton state.
c    -( b^{1, 993}_2 ∧  b^{1, 993}_1 ∧  b^{1, 993}_0 ∧ true) 
c  in CNF:
c    -b^{1, 993}_2 ∨ -b^{1, 993}_1 ∨ -b^{1, 993}_0 ∨ false 
c  in DIMACS:
-4139 -4140 -4141  0

c i = 994
c  -2+1 --> -1
c    ( b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧  p_994) -> ( b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0)
c  in CNF:
c    -b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨  b^{1, 995}_2
c    -b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_1
c    -b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨  b^{1, 995}_0
c  in DIMACS:
-4142 -4143  4144 -994  4145 0
-4142 -4143  4144 -994 -4146 0
-4142 -4143  4144 -994  4147 0

c  -1+1 --> 0
c    ( b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0 ∧  p_994) -> (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧ -b^{1, 995}_0)
c  in CNF:
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_2
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_1
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_0
c  in DIMACS:
-4142  4143 -4144 -994 -4145 0
-4142  4143 -4144 -994 -4146 0
-4142  4143 -4144 -994 -4147 0

c  0+1 --> 1
c    (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧  p_994) -> (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0)
c  in CNF:
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_2
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_1
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨  b^{1, 995}_0
c  in DIMACS:
 4142  4143  4144 -994 -4145 0
 4142  4143  4144 -994 -4146 0
 4142  4143  4144 -994  4147 0

c  1+1 --> 2
c    (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0 ∧  p_994) -> (-b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0)
c  in CNF:
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_2
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨  b^{1, 995}_1
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ -p_994 ∨ -b^{1, 995}_0
c  in DIMACS:
 4142  4143 -4144 -994 -4145 0
 4142  4143 -4144 -994  4146 0
 4142  4143 -4144 -994 -4147 0

c  2+1 --> break 
c    (-b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧  p_994) -> break
c  in CNF:
c     b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 4142 -4143  4144 -994 1162 0


c  2-1 --> 1
c    (-b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧ -p_994) -> (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0)
c  in CNF:
c     b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_2
c     b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_1
c     b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨  b^{1, 995}_0
c  in DIMACS:
 4142 -4143  4144  994 -4145 0
 4142 -4143  4144  994 -4146 0
 4142 -4143  4144  994  4147 0

c  1-1 --> 0
c    (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0 ∧ -p_994) -> (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧ -b^{1, 995}_0)
c  in CNF:
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_2
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_1
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_0
c  in DIMACS:
 4142  4143 -4144  994 -4145 0
 4142  4143 -4144  994 -4146 0
 4142  4143 -4144  994 -4147 0

c  0-1 --> -1
c    (-b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧ -p_994) -> ( b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0)
c  in CNF:
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨  b^{1, 995}_2
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_1
c     b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨  b^{1, 995}_0
c  in DIMACS:
 4142  4143  4144  994  4145 0
 4142  4143  4144  994 -4146 0
 4142  4143  4144  994  4147 0

c  -1-1 --> -2
c    ( b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧  b^{1, 994}_0 ∧ -p_994) -> ( b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0)
c  in CNF:
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨  b^{1, 995}_2
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨  b^{1, 995}_1
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨  p_994 ∨ -b^{1, 995}_0
c  in DIMACS:
-4142  4143 -4144  994  4145 0
-4142  4143 -4144  994  4146 0
-4142  4143 -4144  994 -4147 0

c  -2-1 --> break 
c    ( b^{1, 994}_2 ∧  b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨  b^{1, 994}_0 ∨  p_994 ∨ break
c  in DIMACS:
-4142 -4143  4144  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 994}_2 ∧ -b^{1, 994}_1 ∧ -b^{1, 994}_0 ∧ true) 
c  in CNF:
c    -b^{1, 994}_2 ∨  b^{1, 994}_1 ∨  b^{1, 994}_0 ∨ false 
c  in DIMACS:
-4142  4143  4144  0

c  3 does not represent an automaton state.
c    -(-b^{1, 994}_2 ∧  b^{1, 994}_1 ∧  b^{1, 994}_0 ∧ true) 
c  in CNF:
c     b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ false 
c  in DIMACS:
 4142 -4143 -4144  0
c  -3 does not represent an automaton state.
c    -( b^{1, 994}_2 ∧  b^{1, 994}_1 ∧  b^{1, 994}_0 ∧ true) 
c  in CNF:
c    -b^{1, 994}_2 ∨ -b^{1, 994}_1 ∨ -b^{1, 994}_0 ∨ false 
c  in DIMACS:
-4142 -4143 -4144  0

c i = 995
c  -2+1 --> -1
c    ( b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧  p_995) -> ( b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0)
c  in CNF:
c    -b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨  b^{1, 996}_2
c    -b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_1
c    -b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨  b^{1, 996}_0
c  in DIMACS:
-4145 -4146  4147 -995  4148 0
-4145 -4146  4147 -995 -4149 0
-4145 -4146  4147 -995  4150 0

c  -1+1 --> 0
c    ( b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0 ∧  p_995) -> (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧ -b^{1, 996}_0)
c  in CNF:
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_2
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_1
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_0
c  in DIMACS:
-4145  4146 -4147 -995 -4148 0
-4145  4146 -4147 -995 -4149 0
-4145  4146 -4147 -995 -4150 0

c  0+1 --> 1
c    (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧  p_995) -> (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0)
c  in CNF:
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_2
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_1
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨  b^{1, 996}_0
c  in DIMACS:
 4145  4146  4147 -995 -4148 0
 4145  4146  4147 -995 -4149 0
 4145  4146  4147 -995  4150 0

c  1+1 --> 2
c    (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0 ∧  p_995) -> (-b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0)
c  in CNF:
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_2
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨  b^{1, 996}_1
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ -p_995 ∨ -b^{1, 996}_0
c  in DIMACS:
 4145  4146 -4147 -995 -4148 0
 4145  4146 -4147 -995  4149 0
 4145  4146 -4147 -995 -4150 0

c  2+1 --> break 
c    (-b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧  p_995) -> break
c  in CNF:
c     b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ -p_995 ∨ break
c  in DIMACS:
 4145 -4146  4147 -995 1162 0


c  2-1 --> 1
c    (-b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧ -p_995) -> (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0)
c  in CNF:
c     b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_2
c     b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_1
c     b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨  b^{1, 996}_0
c  in DIMACS:
 4145 -4146  4147  995 -4148 0
 4145 -4146  4147  995 -4149 0
 4145 -4146  4147  995  4150 0

c  1-1 --> 0
c    (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0 ∧ -p_995) -> (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧ -b^{1, 996}_0)
c  in CNF:
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_2
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_1
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_0
c  in DIMACS:
 4145  4146 -4147  995 -4148 0
 4145  4146 -4147  995 -4149 0
 4145  4146 -4147  995 -4150 0

c  0-1 --> -1
c    (-b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧ -p_995) -> ( b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0)
c  in CNF:
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨  b^{1, 996}_2
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_1
c     b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨  b^{1, 996}_0
c  in DIMACS:
 4145  4146  4147  995  4148 0
 4145  4146  4147  995 -4149 0
 4145  4146  4147  995  4150 0

c  -1-1 --> -2
c    ( b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧  b^{1, 995}_0 ∧ -p_995) -> ( b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0)
c  in CNF:
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨  b^{1, 996}_2
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨  b^{1, 996}_1
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨  p_995 ∨ -b^{1, 996}_0
c  in DIMACS:
-4145  4146 -4147  995  4148 0
-4145  4146 -4147  995  4149 0
-4145  4146 -4147  995 -4150 0

c  -2-1 --> break 
c    ( b^{1, 995}_2 ∧  b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧ -p_995) -> break
c  in CNF:
c    -b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨  b^{1, 995}_0 ∨  p_995 ∨ break
c  in DIMACS:
-4145 -4146  4147  995 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 995}_2 ∧ -b^{1, 995}_1 ∧ -b^{1, 995}_0 ∧ true) 
c  in CNF:
c    -b^{1, 995}_2 ∨  b^{1, 995}_1 ∨  b^{1, 995}_0 ∨ false 
c  in DIMACS:
-4145  4146  4147  0

c  3 does not represent an automaton state.
c    -(-b^{1, 995}_2 ∧  b^{1, 995}_1 ∧  b^{1, 995}_0 ∧ true) 
c  in CNF:
c     b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ false 
c  in DIMACS:
 4145 -4146 -4147  0
c  -3 does not represent an automaton state.
c    -( b^{1, 995}_2 ∧  b^{1, 995}_1 ∧  b^{1, 995}_0 ∧ true) 
c  in CNF:
c    -b^{1, 995}_2 ∨ -b^{1, 995}_1 ∨ -b^{1, 995}_0 ∨ false 
c  in DIMACS:
-4145 -4146 -4147  0

c i = 996
c  -2+1 --> -1
c    ( b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧  p_996) -> ( b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0)
c  in CNF:
c    -b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨  b^{1, 997}_2
c    -b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_1
c    -b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨  b^{1, 997}_0
c  in DIMACS:
-4148 -4149  4150 -996  4151 0
-4148 -4149  4150 -996 -4152 0
-4148 -4149  4150 -996  4153 0

c  -1+1 --> 0
c    ( b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0 ∧  p_996) -> (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧ -b^{1, 997}_0)
c  in CNF:
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_2
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_1
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_0
c  in DIMACS:
-4148  4149 -4150 -996 -4151 0
-4148  4149 -4150 -996 -4152 0
-4148  4149 -4150 -996 -4153 0

c  0+1 --> 1
c    (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧  p_996) -> (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0)
c  in CNF:
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_2
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_1
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨  b^{1, 997}_0
c  in DIMACS:
 4148  4149  4150 -996 -4151 0
 4148  4149  4150 -996 -4152 0
 4148  4149  4150 -996  4153 0

c  1+1 --> 2
c    (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0 ∧  p_996) -> (-b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0)
c  in CNF:
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_2
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨  b^{1, 997}_1
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ -p_996 ∨ -b^{1, 997}_0
c  in DIMACS:
 4148  4149 -4150 -996 -4151 0
 4148  4149 -4150 -996  4152 0
 4148  4149 -4150 -996 -4153 0

c  2+1 --> break 
c    (-b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧  p_996) -> break
c  in CNF:
c     b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 4148 -4149  4150 -996 1162 0


c  2-1 --> 1
c    (-b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧ -p_996) -> (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0)
c  in CNF:
c     b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_2
c     b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_1
c     b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨  b^{1, 997}_0
c  in DIMACS:
 4148 -4149  4150  996 -4151 0
 4148 -4149  4150  996 -4152 0
 4148 -4149  4150  996  4153 0

c  1-1 --> 0
c    (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0 ∧ -p_996) -> (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧ -b^{1, 997}_0)
c  in CNF:
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_2
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_1
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_0
c  in DIMACS:
 4148  4149 -4150  996 -4151 0
 4148  4149 -4150  996 -4152 0
 4148  4149 -4150  996 -4153 0

c  0-1 --> -1
c    (-b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧ -p_996) -> ( b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0)
c  in CNF:
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨  b^{1, 997}_2
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_1
c     b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨  b^{1, 997}_0
c  in DIMACS:
 4148  4149  4150  996  4151 0
 4148  4149  4150  996 -4152 0
 4148  4149  4150  996  4153 0

c  -1-1 --> -2
c    ( b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧  b^{1, 996}_0 ∧ -p_996) -> ( b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0)
c  in CNF:
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨  b^{1, 997}_2
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨  b^{1, 997}_1
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨  p_996 ∨ -b^{1, 997}_0
c  in DIMACS:
-4148  4149 -4150  996  4151 0
-4148  4149 -4150  996  4152 0
-4148  4149 -4150  996 -4153 0

c  -2-1 --> break 
c    ( b^{1, 996}_2 ∧  b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨  b^{1, 996}_0 ∨  p_996 ∨ break
c  in DIMACS:
-4148 -4149  4150  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 996}_2 ∧ -b^{1, 996}_1 ∧ -b^{1, 996}_0 ∧ true) 
c  in CNF:
c    -b^{1, 996}_2 ∨  b^{1, 996}_1 ∨  b^{1, 996}_0 ∨ false 
c  in DIMACS:
-4148  4149  4150  0

c  3 does not represent an automaton state.
c    -(-b^{1, 996}_2 ∧  b^{1, 996}_1 ∧  b^{1, 996}_0 ∧ true) 
c  in CNF:
c     b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ false 
c  in DIMACS:
 4148 -4149 -4150  0
c  -3 does not represent an automaton state.
c    -( b^{1, 996}_2 ∧  b^{1, 996}_1 ∧  b^{1, 996}_0 ∧ true) 
c  in CNF:
c    -b^{1, 996}_2 ∨ -b^{1, 996}_1 ∨ -b^{1, 996}_0 ∨ false 
c  in DIMACS:
-4148 -4149 -4150  0

c i = 997
c  -2+1 --> -1
c    ( b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧  p_997) -> ( b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0)
c  in CNF:
c    -b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨  b^{1, 998}_2
c    -b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_1
c    -b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨  b^{1, 998}_0
c  in DIMACS:
-4151 -4152  4153 -997  4154 0
-4151 -4152  4153 -997 -4155 0
-4151 -4152  4153 -997  4156 0

c  -1+1 --> 0
c    ( b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0 ∧  p_997) -> (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧ -b^{1, 998}_0)
c  in CNF:
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_2
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_1
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_0
c  in DIMACS:
-4151  4152 -4153 -997 -4154 0
-4151  4152 -4153 -997 -4155 0
-4151  4152 -4153 -997 -4156 0

c  0+1 --> 1
c    (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧  p_997) -> (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0)
c  in CNF:
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_2
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_1
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨  b^{1, 998}_0
c  in DIMACS:
 4151  4152  4153 -997 -4154 0
 4151  4152  4153 -997 -4155 0
 4151  4152  4153 -997  4156 0

c  1+1 --> 2
c    (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0 ∧  p_997) -> (-b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0)
c  in CNF:
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_2
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨  b^{1, 998}_1
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ -p_997 ∨ -b^{1, 998}_0
c  in DIMACS:
 4151  4152 -4153 -997 -4154 0
 4151  4152 -4153 -997  4155 0
 4151  4152 -4153 -997 -4156 0

c  2+1 --> break 
c    (-b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧  p_997) -> break
c  in CNF:
c     b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ -p_997 ∨ break
c  in DIMACS:
 4151 -4152  4153 -997 1162 0


c  2-1 --> 1
c    (-b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧ -p_997) -> (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0)
c  in CNF:
c     b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_2
c     b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_1
c     b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨  b^{1, 998}_0
c  in DIMACS:
 4151 -4152  4153  997 -4154 0
 4151 -4152  4153  997 -4155 0
 4151 -4152  4153  997  4156 0

c  1-1 --> 0
c    (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0 ∧ -p_997) -> (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧ -b^{1, 998}_0)
c  in CNF:
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_2
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_1
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_0
c  in DIMACS:
 4151  4152 -4153  997 -4154 0
 4151  4152 -4153  997 -4155 0
 4151  4152 -4153  997 -4156 0

c  0-1 --> -1
c    (-b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧ -p_997) -> ( b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0)
c  in CNF:
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨  b^{1, 998}_2
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_1
c     b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨  b^{1, 998}_0
c  in DIMACS:
 4151  4152  4153  997  4154 0
 4151  4152  4153  997 -4155 0
 4151  4152  4153  997  4156 0

c  -1-1 --> -2
c    ( b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧  b^{1, 997}_0 ∧ -p_997) -> ( b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0)
c  in CNF:
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨  b^{1, 998}_2
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨  b^{1, 998}_1
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨  p_997 ∨ -b^{1, 998}_0
c  in DIMACS:
-4151  4152 -4153  997  4154 0
-4151  4152 -4153  997  4155 0
-4151  4152 -4153  997 -4156 0

c  -2-1 --> break 
c    ( b^{1, 997}_2 ∧  b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧ -p_997) -> break
c  in CNF:
c    -b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨  b^{1, 997}_0 ∨  p_997 ∨ break
c  in DIMACS:
-4151 -4152  4153  997 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 997}_2 ∧ -b^{1, 997}_1 ∧ -b^{1, 997}_0 ∧ true) 
c  in CNF:
c    -b^{1, 997}_2 ∨  b^{1, 997}_1 ∨  b^{1, 997}_0 ∨ false 
c  in DIMACS:
-4151  4152  4153  0

c  3 does not represent an automaton state.
c    -(-b^{1, 997}_2 ∧  b^{1, 997}_1 ∧  b^{1, 997}_0 ∧ true) 
c  in CNF:
c     b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ false 
c  in DIMACS:
 4151 -4152 -4153  0
c  -3 does not represent an automaton state.
c    -( b^{1, 997}_2 ∧  b^{1, 997}_1 ∧  b^{1, 997}_0 ∧ true) 
c  in CNF:
c    -b^{1, 997}_2 ∨ -b^{1, 997}_1 ∨ -b^{1, 997}_0 ∨ false 
c  in DIMACS:
-4151 -4152 -4153  0

c i = 998
c  -2+1 --> -1
c    ( b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧  p_998) -> ( b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0)
c  in CNF:
c    -b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨  b^{1, 999}_2
c    -b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_1
c    -b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨  b^{1, 999}_0
c  in DIMACS:
-4154 -4155  4156 -998  4157 0
-4154 -4155  4156 -998 -4158 0
-4154 -4155  4156 -998  4159 0

c  -1+1 --> 0
c    ( b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0 ∧  p_998) -> (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧ -b^{1, 999}_0)
c  in CNF:
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_2
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_1
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_0
c  in DIMACS:
-4154  4155 -4156 -998 -4157 0
-4154  4155 -4156 -998 -4158 0
-4154  4155 -4156 -998 -4159 0

c  0+1 --> 1
c    (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧  p_998) -> (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0)
c  in CNF:
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_2
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_1
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨  b^{1, 999}_0
c  in DIMACS:
 4154  4155  4156 -998 -4157 0
 4154  4155  4156 -998 -4158 0
 4154  4155  4156 -998  4159 0

c  1+1 --> 2
c    (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0 ∧  p_998) -> (-b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0)
c  in CNF:
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_2
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨  b^{1, 999}_1
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ -p_998 ∨ -b^{1, 999}_0
c  in DIMACS:
 4154  4155 -4156 -998 -4157 0
 4154  4155 -4156 -998  4158 0
 4154  4155 -4156 -998 -4159 0

c  2+1 --> break 
c    (-b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧  p_998) -> break
c  in CNF:
c     b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ -p_998 ∨ break
c  in DIMACS:
 4154 -4155  4156 -998 1162 0


c  2-1 --> 1
c    (-b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧ -p_998) -> (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0)
c  in CNF:
c     b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_2
c     b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_1
c     b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨  b^{1, 999}_0
c  in DIMACS:
 4154 -4155  4156  998 -4157 0
 4154 -4155  4156  998 -4158 0
 4154 -4155  4156  998  4159 0

c  1-1 --> 0
c    (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0 ∧ -p_998) -> (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧ -b^{1, 999}_0)
c  in CNF:
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_2
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_1
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_0
c  in DIMACS:
 4154  4155 -4156  998 -4157 0
 4154  4155 -4156  998 -4158 0
 4154  4155 -4156  998 -4159 0

c  0-1 --> -1
c    (-b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧ -p_998) -> ( b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0)
c  in CNF:
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨  b^{1, 999}_2
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_1
c     b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨  b^{1, 999}_0
c  in DIMACS:
 4154  4155  4156  998  4157 0
 4154  4155  4156  998 -4158 0
 4154  4155  4156  998  4159 0

c  -1-1 --> -2
c    ( b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧  b^{1, 998}_0 ∧ -p_998) -> ( b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0)
c  in CNF:
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨  b^{1, 999}_2
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨  b^{1, 999}_1
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨  p_998 ∨ -b^{1, 999}_0
c  in DIMACS:
-4154  4155 -4156  998  4157 0
-4154  4155 -4156  998  4158 0
-4154  4155 -4156  998 -4159 0

c  -2-1 --> break 
c    ( b^{1, 998}_2 ∧  b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧ -p_998) -> break
c  in CNF:
c    -b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨  b^{1, 998}_0 ∨  p_998 ∨ break
c  in DIMACS:
-4154 -4155  4156  998 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 998}_2 ∧ -b^{1, 998}_1 ∧ -b^{1, 998}_0 ∧ true) 
c  in CNF:
c    -b^{1, 998}_2 ∨  b^{1, 998}_1 ∨  b^{1, 998}_0 ∨ false 
c  in DIMACS:
-4154  4155  4156  0

c  3 does not represent an automaton state.
c    -(-b^{1, 998}_2 ∧  b^{1, 998}_1 ∧  b^{1, 998}_0 ∧ true) 
c  in CNF:
c     b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ false 
c  in DIMACS:
 4154 -4155 -4156  0
c  -3 does not represent an automaton state.
c    -( b^{1, 998}_2 ∧  b^{1, 998}_1 ∧  b^{1, 998}_0 ∧ true) 
c  in CNF:
c    -b^{1, 998}_2 ∨ -b^{1, 998}_1 ∨ -b^{1, 998}_0 ∨ false 
c  in DIMACS:
-4154 -4155 -4156  0

c i = 999
c  -2+1 --> -1
c    ( b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧  p_999) -> ( b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0)
c  in CNF:
c    -b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨  b^{1, 1000}_2
c    -b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_1
c    -b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨  b^{1, 1000}_0
c  in DIMACS:
-4157 -4158  4159 -999  4160 0
-4157 -4158  4159 -999 -4161 0
-4157 -4158  4159 -999  4162 0

c  -1+1 --> 0
c    ( b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0 ∧  p_999) -> (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧ -b^{1, 1000}_0)
c  in CNF:
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_2
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_1
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_0
c  in DIMACS:
-4157  4158 -4159 -999 -4160 0
-4157  4158 -4159 -999 -4161 0
-4157  4158 -4159 -999 -4162 0

c  0+1 --> 1
c    (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧  p_999) -> (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0)
c  in CNF:
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_2
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_1
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨  b^{1, 1000}_0
c  in DIMACS:
 4157  4158  4159 -999 -4160 0
 4157  4158  4159 -999 -4161 0
 4157  4158  4159 -999  4162 0

c  1+1 --> 2
c    (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0 ∧  p_999) -> (-b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0)
c  in CNF:
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_2
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨  b^{1, 1000}_1
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ -p_999 ∨ -b^{1, 1000}_0
c  in DIMACS:
 4157  4158 -4159 -999 -4160 0
 4157  4158 -4159 -999  4161 0
 4157  4158 -4159 -999 -4162 0

c  2+1 --> break 
c    (-b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧  p_999) -> break
c  in CNF:
c     b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 4157 -4158  4159 -999 1162 0


c  2-1 --> 1
c    (-b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧ -p_999) -> (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0)
c  in CNF:
c     b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_2
c     b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_1
c     b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨  b^{1, 1000}_0
c  in DIMACS:
 4157 -4158  4159  999 -4160 0
 4157 -4158  4159  999 -4161 0
 4157 -4158  4159  999  4162 0

c  1-1 --> 0
c    (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0 ∧ -p_999) -> (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧ -b^{1, 1000}_0)
c  in CNF:
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_2
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_1
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_0
c  in DIMACS:
 4157  4158 -4159  999 -4160 0
 4157  4158 -4159  999 -4161 0
 4157  4158 -4159  999 -4162 0

c  0-1 --> -1
c    (-b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧ -p_999) -> ( b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0)
c  in CNF:
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨  b^{1, 1000}_2
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_1
c     b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨  b^{1, 1000}_0
c  in DIMACS:
 4157  4158  4159  999  4160 0
 4157  4158  4159  999 -4161 0
 4157  4158  4159  999  4162 0

c  -1-1 --> -2
c    ( b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧  b^{1, 999}_0 ∧ -p_999) -> ( b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0)
c  in CNF:
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨  b^{1, 1000}_2
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨  b^{1, 1000}_1
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨  p_999 ∨ -b^{1, 1000}_0
c  in DIMACS:
-4157  4158 -4159  999  4160 0
-4157  4158 -4159  999  4161 0
-4157  4158 -4159  999 -4162 0

c  -2-1 --> break 
c    ( b^{1, 999}_2 ∧  b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨  b^{1, 999}_0 ∨  p_999 ∨ break
c  in DIMACS:
-4157 -4158  4159  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 999}_2 ∧ -b^{1, 999}_1 ∧ -b^{1, 999}_0 ∧ true) 
c  in CNF:
c    -b^{1, 999}_2 ∨  b^{1, 999}_1 ∨  b^{1, 999}_0 ∨ false 
c  in DIMACS:
-4157  4158  4159  0

c  3 does not represent an automaton state.
c    -(-b^{1, 999}_2 ∧  b^{1, 999}_1 ∧  b^{1, 999}_0 ∧ true) 
c  in CNF:
c     b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ false 
c  in DIMACS:
 4157 -4158 -4159  0
c  -3 does not represent an automaton state.
c    -( b^{1, 999}_2 ∧  b^{1, 999}_1 ∧  b^{1, 999}_0 ∧ true) 
c  in CNF:
c    -b^{1, 999}_2 ∨ -b^{1, 999}_1 ∨ -b^{1, 999}_0 ∨ false 
c  in DIMACS:
-4157 -4158 -4159  0

c i = 1000
c  -2+1 --> -1
c    ( b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧  p_1000) -> ( b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0)
c  in CNF:
c    -b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨  b^{1, 1001}_2
c    -b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_1
c    -b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨  b^{1, 1001}_0
c  in DIMACS:
-4160 -4161  4162 -1000  4163 0
-4160 -4161  4162 -1000 -4164 0
-4160 -4161  4162 -1000  4165 0

c  -1+1 --> 0
c    ( b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧  p_1000) -> (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧ -b^{1, 1001}_0)
c  in CNF:
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_2
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_1
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_0
c  in DIMACS:
-4160  4161 -4162 -1000 -4163 0
-4160  4161 -4162 -1000 -4164 0
-4160  4161 -4162 -1000 -4165 0

c  0+1 --> 1
c    (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧  p_1000) -> (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0)
c  in CNF:
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_2
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_1
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨  b^{1, 1001}_0
c  in DIMACS:
 4160  4161  4162 -1000 -4163 0
 4160  4161  4162 -1000 -4164 0
 4160  4161  4162 -1000  4165 0

c  1+1 --> 2
c    (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧  p_1000) -> (-b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0)
c  in CNF:
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_2
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨  b^{1, 1001}_1
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ -p_1000 ∨ -b^{1, 1001}_0
c  in DIMACS:
 4160  4161 -4162 -1000 -4163 0
 4160  4161 -4162 -1000  4164 0
 4160  4161 -4162 -1000 -4165 0

c  2+1 --> break 
c    (-b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 4160 -4161  4162 -1000 1162 0


c  2-1 --> 1
c    (-b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧ -p_1000) -> (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0)
c  in CNF:
c     b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_2
c     b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_1
c     b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨  b^{1, 1001}_0
c  in DIMACS:
 4160 -4161  4162  1000 -4163 0
 4160 -4161  4162  1000 -4164 0
 4160 -4161  4162  1000  4165 0

c  1-1 --> 0
c    (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧ -p_1000) -> (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧ -b^{1, 1001}_0)
c  in CNF:
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_2
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_1
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_0
c  in DIMACS:
 4160  4161 -4162  1000 -4163 0
 4160  4161 -4162  1000 -4164 0
 4160  4161 -4162  1000 -4165 0

c  0-1 --> -1
c    (-b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧ -p_1000) -> ( b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0)
c  in CNF:
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨  b^{1, 1001}_2
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_1
c     b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨  b^{1, 1001}_0
c  in DIMACS:
 4160  4161  4162  1000  4163 0
 4160  4161  4162  1000 -4164 0
 4160  4161  4162  1000  4165 0

c  -1-1 --> -2
c    ( b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧ -p_1000) -> ( b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0)
c  in CNF:
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨  b^{1, 1001}_2
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨  b^{1, 1001}_1
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨  p_1000 ∨ -b^{1, 1001}_0
c  in DIMACS:
-4160  4161 -4162  1000  4163 0
-4160  4161 -4162  1000  4164 0
-4160  4161 -4162  1000 -4165 0

c  -2-1 --> break 
c    ( b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-4160 -4161  4162  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1000}_2 ∧ -b^{1, 1000}_1 ∧ -b^{1, 1000}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1000}_2 ∨  b^{1, 1000}_1 ∨  b^{1, 1000}_0 ∨ false 
c  in DIMACS:
-4160  4161  4162  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧ true) 
c  in CNF:
c     b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ false 
c  in DIMACS:
 4160 -4161 -4162  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1000}_2 ∧  b^{1, 1000}_1 ∧  b^{1, 1000}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1000}_2 ∨ -b^{1, 1000}_1 ∨ -b^{1, 1000}_0 ∨ false 
c  in DIMACS:
-4160 -4161 -4162  0

c i = 1001
c  -2+1 --> -1
c    ( b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧  p_1001) -> ( b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0)
c  in CNF:
c    -b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨  b^{1, 1002}_2
c    -b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_1
c    -b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨  b^{1, 1002}_0
c  in DIMACS:
-4163 -4164  4165 -1001  4166 0
-4163 -4164  4165 -1001 -4167 0
-4163 -4164  4165 -1001  4168 0

c  -1+1 --> 0
c    ( b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧  p_1001) -> (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧ -b^{1, 1002}_0)
c  in CNF:
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_2
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_1
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_0
c  in DIMACS:
-4163  4164 -4165 -1001 -4166 0
-4163  4164 -4165 -1001 -4167 0
-4163  4164 -4165 -1001 -4168 0

c  0+1 --> 1
c    (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧  p_1001) -> (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0)
c  in CNF:
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_2
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_1
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨  b^{1, 1002}_0
c  in DIMACS:
 4163  4164  4165 -1001 -4166 0
 4163  4164  4165 -1001 -4167 0
 4163  4164  4165 -1001  4168 0

c  1+1 --> 2
c    (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧  p_1001) -> (-b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0)
c  in CNF:
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_2
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨  b^{1, 1002}_1
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ -p_1001 ∨ -b^{1, 1002}_0
c  in DIMACS:
 4163  4164 -4165 -1001 -4166 0
 4163  4164 -4165 -1001  4167 0
 4163  4164 -4165 -1001 -4168 0

c  2+1 --> break 
c    (-b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 4163 -4164  4165 -1001 1162 0


c  2-1 --> 1
c    (-b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧ -p_1001) -> (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0)
c  in CNF:
c     b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_2
c     b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_1
c     b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨  b^{1, 1002}_0
c  in DIMACS:
 4163 -4164  4165  1001 -4166 0
 4163 -4164  4165  1001 -4167 0
 4163 -4164  4165  1001  4168 0

c  1-1 --> 0
c    (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧ -p_1001) -> (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧ -b^{1, 1002}_0)
c  in CNF:
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_2
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_1
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_0
c  in DIMACS:
 4163  4164 -4165  1001 -4166 0
 4163  4164 -4165  1001 -4167 0
 4163  4164 -4165  1001 -4168 0

c  0-1 --> -1
c    (-b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧ -p_1001) -> ( b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0)
c  in CNF:
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨  b^{1, 1002}_2
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_1
c     b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨  b^{1, 1002}_0
c  in DIMACS:
 4163  4164  4165  1001  4166 0
 4163  4164  4165  1001 -4167 0
 4163  4164  4165  1001  4168 0

c  -1-1 --> -2
c    ( b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧ -p_1001) -> ( b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0)
c  in CNF:
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨  b^{1, 1002}_2
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨  b^{1, 1002}_1
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨  p_1001 ∨ -b^{1, 1002}_0
c  in DIMACS:
-4163  4164 -4165  1001  4166 0
-4163  4164 -4165  1001  4167 0
-4163  4164 -4165  1001 -4168 0

c  -2-1 --> break 
c    ( b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-4163 -4164  4165  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1001}_2 ∧ -b^{1, 1001}_1 ∧ -b^{1, 1001}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1001}_2 ∨  b^{1, 1001}_1 ∨  b^{1, 1001}_0 ∨ false 
c  in DIMACS:
-4163  4164  4165  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧ true) 
c  in CNF:
c     b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ false 
c  in DIMACS:
 4163 -4164 -4165  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1001}_2 ∧  b^{1, 1001}_1 ∧  b^{1, 1001}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1001}_2 ∨ -b^{1, 1001}_1 ∨ -b^{1, 1001}_0 ∨ false 
c  in DIMACS:
-4163 -4164 -4165  0

c i = 1002
c  -2+1 --> -1
c    ( b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧  p_1002) -> ( b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0)
c  in CNF:
c    -b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨  b^{1, 1003}_2
c    -b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_1
c    -b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨  b^{1, 1003}_0
c  in DIMACS:
-4166 -4167  4168 -1002  4169 0
-4166 -4167  4168 -1002 -4170 0
-4166 -4167  4168 -1002  4171 0

c  -1+1 --> 0
c    ( b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧  p_1002) -> (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧ -b^{1, 1003}_0)
c  in CNF:
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_2
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_1
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_0
c  in DIMACS:
-4166  4167 -4168 -1002 -4169 0
-4166  4167 -4168 -1002 -4170 0
-4166  4167 -4168 -1002 -4171 0

c  0+1 --> 1
c    (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧  p_1002) -> (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0)
c  in CNF:
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_2
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_1
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨  b^{1, 1003}_0
c  in DIMACS:
 4166  4167  4168 -1002 -4169 0
 4166  4167  4168 -1002 -4170 0
 4166  4167  4168 -1002  4171 0

c  1+1 --> 2
c    (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧  p_1002) -> (-b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0)
c  in CNF:
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_2
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨  b^{1, 1003}_1
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ -p_1002 ∨ -b^{1, 1003}_0
c  in DIMACS:
 4166  4167 -4168 -1002 -4169 0
 4166  4167 -4168 -1002  4170 0
 4166  4167 -4168 -1002 -4171 0

c  2+1 --> break 
c    (-b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 4166 -4167  4168 -1002 1162 0


c  2-1 --> 1
c    (-b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧ -p_1002) -> (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0)
c  in CNF:
c     b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_2
c     b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_1
c     b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨  b^{1, 1003}_0
c  in DIMACS:
 4166 -4167  4168  1002 -4169 0
 4166 -4167  4168  1002 -4170 0
 4166 -4167  4168  1002  4171 0

c  1-1 --> 0
c    (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧ -p_1002) -> (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧ -b^{1, 1003}_0)
c  in CNF:
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_2
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_1
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_0
c  in DIMACS:
 4166  4167 -4168  1002 -4169 0
 4166  4167 -4168  1002 -4170 0
 4166  4167 -4168  1002 -4171 0

c  0-1 --> -1
c    (-b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧ -p_1002) -> ( b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0)
c  in CNF:
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨  b^{1, 1003}_2
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_1
c     b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨  b^{1, 1003}_0
c  in DIMACS:
 4166  4167  4168  1002  4169 0
 4166  4167  4168  1002 -4170 0
 4166  4167  4168  1002  4171 0

c  -1-1 --> -2
c    ( b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧ -p_1002) -> ( b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0)
c  in CNF:
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨  b^{1, 1003}_2
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨  b^{1, 1003}_1
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨  p_1002 ∨ -b^{1, 1003}_0
c  in DIMACS:
-4166  4167 -4168  1002  4169 0
-4166  4167 -4168  1002  4170 0
-4166  4167 -4168  1002 -4171 0

c  -2-1 --> break 
c    ( b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-4166 -4167  4168  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1002}_2 ∧ -b^{1, 1002}_1 ∧ -b^{1, 1002}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1002}_2 ∨  b^{1, 1002}_1 ∨  b^{1, 1002}_0 ∨ false 
c  in DIMACS:
-4166  4167  4168  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧ true) 
c  in CNF:
c     b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ false 
c  in DIMACS:
 4166 -4167 -4168  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1002}_2 ∧  b^{1, 1002}_1 ∧  b^{1, 1002}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1002}_2 ∨ -b^{1, 1002}_1 ∨ -b^{1, 1002}_0 ∨ false 
c  in DIMACS:
-4166 -4167 -4168  0

c i = 1003
c  -2+1 --> -1
c    ( b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧  p_1003) -> ( b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0)
c  in CNF:
c    -b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨  b^{1, 1004}_2
c    -b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_1
c    -b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨  b^{1, 1004}_0
c  in DIMACS:
-4169 -4170  4171 -1003  4172 0
-4169 -4170  4171 -1003 -4173 0
-4169 -4170  4171 -1003  4174 0

c  -1+1 --> 0
c    ( b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧  p_1003) -> (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧ -b^{1, 1004}_0)
c  in CNF:
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_2
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_1
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_0
c  in DIMACS:
-4169  4170 -4171 -1003 -4172 0
-4169  4170 -4171 -1003 -4173 0
-4169  4170 -4171 -1003 -4174 0

c  0+1 --> 1
c    (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧  p_1003) -> (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0)
c  in CNF:
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_2
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_1
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨  b^{1, 1004}_0
c  in DIMACS:
 4169  4170  4171 -1003 -4172 0
 4169  4170  4171 -1003 -4173 0
 4169  4170  4171 -1003  4174 0

c  1+1 --> 2
c    (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧  p_1003) -> (-b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0)
c  in CNF:
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_2
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨  b^{1, 1004}_1
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ -p_1003 ∨ -b^{1, 1004}_0
c  in DIMACS:
 4169  4170 -4171 -1003 -4172 0
 4169  4170 -4171 -1003  4173 0
 4169  4170 -4171 -1003 -4174 0

c  2+1 --> break 
c    (-b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧  p_1003) -> break
c  in CNF:
c     b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ -p_1003 ∨ break
c  in DIMACS:
 4169 -4170  4171 -1003 1162 0


c  2-1 --> 1
c    (-b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧ -p_1003) -> (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0)
c  in CNF:
c     b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_2
c     b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_1
c     b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨  b^{1, 1004}_0
c  in DIMACS:
 4169 -4170  4171  1003 -4172 0
 4169 -4170  4171  1003 -4173 0
 4169 -4170  4171  1003  4174 0

c  1-1 --> 0
c    (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧ -p_1003) -> (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧ -b^{1, 1004}_0)
c  in CNF:
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_2
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_1
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_0
c  in DIMACS:
 4169  4170 -4171  1003 -4172 0
 4169  4170 -4171  1003 -4173 0
 4169  4170 -4171  1003 -4174 0

c  0-1 --> -1
c    (-b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧ -p_1003) -> ( b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0)
c  in CNF:
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨  b^{1, 1004}_2
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_1
c     b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨  b^{1, 1004}_0
c  in DIMACS:
 4169  4170  4171  1003  4172 0
 4169  4170  4171  1003 -4173 0
 4169  4170  4171  1003  4174 0

c  -1-1 --> -2
c    ( b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧ -p_1003) -> ( b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0)
c  in CNF:
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨  b^{1, 1004}_2
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨  b^{1, 1004}_1
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨  p_1003 ∨ -b^{1, 1004}_0
c  in DIMACS:
-4169  4170 -4171  1003  4172 0
-4169  4170 -4171  1003  4173 0
-4169  4170 -4171  1003 -4174 0

c  -2-1 --> break 
c    ( b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧ -p_1003) -> break
c  in CNF:
c    -b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨  p_1003 ∨ break
c  in DIMACS:
-4169 -4170  4171  1003 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1003}_2 ∧ -b^{1, 1003}_1 ∧ -b^{1, 1003}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1003}_2 ∨  b^{1, 1003}_1 ∨  b^{1, 1003}_0 ∨ false 
c  in DIMACS:
-4169  4170  4171  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧ true) 
c  in CNF:
c     b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ false 
c  in DIMACS:
 4169 -4170 -4171  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1003}_2 ∧  b^{1, 1003}_1 ∧  b^{1, 1003}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1003}_2 ∨ -b^{1, 1003}_1 ∨ -b^{1, 1003}_0 ∨ false 
c  in DIMACS:
-4169 -4170 -4171  0

c i = 1004
c  -2+1 --> -1
c    ( b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧  p_1004) -> ( b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0)
c  in CNF:
c    -b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨  b^{1, 1005}_2
c    -b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_1
c    -b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨  b^{1, 1005}_0
c  in DIMACS:
-4172 -4173  4174 -1004  4175 0
-4172 -4173  4174 -1004 -4176 0
-4172 -4173  4174 -1004  4177 0

c  -1+1 --> 0
c    ( b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧  p_1004) -> (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧ -b^{1, 1005}_0)
c  in CNF:
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_2
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_1
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_0
c  in DIMACS:
-4172  4173 -4174 -1004 -4175 0
-4172  4173 -4174 -1004 -4176 0
-4172  4173 -4174 -1004 -4177 0

c  0+1 --> 1
c    (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧  p_1004) -> (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0)
c  in CNF:
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_2
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_1
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨  b^{1, 1005}_0
c  in DIMACS:
 4172  4173  4174 -1004 -4175 0
 4172  4173  4174 -1004 -4176 0
 4172  4173  4174 -1004  4177 0

c  1+1 --> 2
c    (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧  p_1004) -> (-b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0)
c  in CNF:
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_2
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨  b^{1, 1005}_1
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ -p_1004 ∨ -b^{1, 1005}_0
c  in DIMACS:
 4172  4173 -4174 -1004 -4175 0
 4172  4173 -4174 -1004  4176 0
 4172  4173 -4174 -1004 -4177 0

c  2+1 --> break 
c    (-b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧  p_1004) -> break
c  in CNF:
c     b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ -p_1004 ∨ break
c  in DIMACS:
 4172 -4173  4174 -1004 1162 0


c  2-1 --> 1
c    (-b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧ -p_1004) -> (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0)
c  in CNF:
c     b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_2
c     b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_1
c     b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨  b^{1, 1005}_0
c  in DIMACS:
 4172 -4173  4174  1004 -4175 0
 4172 -4173  4174  1004 -4176 0
 4172 -4173  4174  1004  4177 0

c  1-1 --> 0
c    (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧ -p_1004) -> (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧ -b^{1, 1005}_0)
c  in CNF:
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_2
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_1
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_0
c  in DIMACS:
 4172  4173 -4174  1004 -4175 0
 4172  4173 -4174  1004 -4176 0
 4172  4173 -4174  1004 -4177 0

c  0-1 --> -1
c    (-b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧ -p_1004) -> ( b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0)
c  in CNF:
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨  b^{1, 1005}_2
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_1
c     b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨  b^{1, 1005}_0
c  in DIMACS:
 4172  4173  4174  1004  4175 0
 4172  4173  4174  1004 -4176 0
 4172  4173  4174  1004  4177 0

c  -1-1 --> -2
c    ( b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧ -p_1004) -> ( b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0)
c  in CNF:
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨  b^{1, 1005}_2
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨  b^{1, 1005}_1
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨  p_1004 ∨ -b^{1, 1005}_0
c  in DIMACS:
-4172  4173 -4174  1004  4175 0
-4172  4173 -4174  1004  4176 0
-4172  4173 -4174  1004 -4177 0

c  -2-1 --> break 
c    ( b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧ -p_1004) -> break
c  in CNF:
c    -b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨  p_1004 ∨ break
c  in DIMACS:
-4172 -4173  4174  1004 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1004}_2 ∧ -b^{1, 1004}_1 ∧ -b^{1, 1004}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1004}_2 ∨  b^{1, 1004}_1 ∨  b^{1, 1004}_0 ∨ false 
c  in DIMACS:
-4172  4173  4174  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧ true) 
c  in CNF:
c     b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ false 
c  in DIMACS:
 4172 -4173 -4174  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1004}_2 ∧  b^{1, 1004}_1 ∧  b^{1, 1004}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1004}_2 ∨ -b^{1, 1004}_1 ∨ -b^{1, 1004}_0 ∨ false 
c  in DIMACS:
-4172 -4173 -4174  0

c i = 1005
c  -2+1 --> -1
c    ( b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧  p_1005) -> ( b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0)
c  in CNF:
c    -b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨  b^{1, 1006}_2
c    -b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_1
c    -b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨  b^{1, 1006}_0
c  in DIMACS:
-4175 -4176  4177 -1005  4178 0
-4175 -4176  4177 -1005 -4179 0
-4175 -4176  4177 -1005  4180 0

c  -1+1 --> 0
c    ( b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧  p_1005) -> (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧ -b^{1, 1006}_0)
c  in CNF:
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_2
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_1
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_0
c  in DIMACS:
-4175  4176 -4177 -1005 -4178 0
-4175  4176 -4177 -1005 -4179 0
-4175  4176 -4177 -1005 -4180 0

c  0+1 --> 1
c    (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧  p_1005) -> (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0)
c  in CNF:
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_2
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_1
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨  b^{1, 1006}_0
c  in DIMACS:
 4175  4176  4177 -1005 -4178 0
 4175  4176  4177 -1005 -4179 0
 4175  4176  4177 -1005  4180 0

c  1+1 --> 2
c    (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧  p_1005) -> (-b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0)
c  in CNF:
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_2
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨  b^{1, 1006}_1
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ -p_1005 ∨ -b^{1, 1006}_0
c  in DIMACS:
 4175  4176 -4177 -1005 -4178 0
 4175  4176 -4177 -1005  4179 0
 4175  4176 -4177 -1005 -4180 0

c  2+1 --> break 
c    (-b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 4175 -4176  4177 -1005 1162 0


c  2-1 --> 1
c    (-b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧ -p_1005) -> (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0)
c  in CNF:
c     b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_2
c     b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_1
c     b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨  b^{1, 1006}_0
c  in DIMACS:
 4175 -4176  4177  1005 -4178 0
 4175 -4176  4177  1005 -4179 0
 4175 -4176  4177  1005  4180 0

c  1-1 --> 0
c    (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧ -p_1005) -> (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧ -b^{1, 1006}_0)
c  in CNF:
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_2
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_1
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_0
c  in DIMACS:
 4175  4176 -4177  1005 -4178 0
 4175  4176 -4177  1005 -4179 0
 4175  4176 -4177  1005 -4180 0

c  0-1 --> -1
c    (-b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧ -p_1005) -> ( b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0)
c  in CNF:
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨  b^{1, 1006}_2
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_1
c     b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨  b^{1, 1006}_0
c  in DIMACS:
 4175  4176  4177  1005  4178 0
 4175  4176  4177  1005 -4179 0
 4175  4176  4177  1005  4180 0

c  -1-1 --> -2
c    ( b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧ -p_1005) -> ( b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0)
c  in CNF:
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨  b^{1, 1006}_2
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨  b^{1, 1006}_1
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨  p_1005 ∨ -b^{1, 1006}_0
c  in DIMACS:
-4175  4176 -4177  1005  4178 0
-4175  4176 -4177  1005  4179 0
-4175  4176 -4177  1005 -4180 0

c  -2-1 --> break 
c    ( b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-4175 -4176  4177  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1005}_2 ∧ -b^{1, 1005}_1 ∧ -b^{1, 1005}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1005}_2 ∨  b^{1, 1005}_1 ∨  b^{1, 1005}_0 ∨ false 
c  in DIMACS:
-4175  4176  4177  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧ true) 
c  in CNF:
c     b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ false 
c  in DIMACS:
 4175 -4176 -4177  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1005}_2 ∧  b^{1, 1005}_1 ∧  b^{1, 1005}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1005}_2 ∨ -b^{1, 1005}_1 ∨ -b^{1, 1005}_0 ∨ false 
c  in DIMACS:
-4175 -4176 -4177  0

c i = 1006
c  -2+1 --> -1
c    ( b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧  p_1006) -> ( b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0)
c  in CNF:
c    -b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨  b^{1, 1007}_2
c    -b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_1
c    -b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨  b^{1, 1007}_0
c  in DIMACS:
-4178 -4179  4180 -1006  4181 0
-4178 -4179  4180 -1006 -4182 0
-4178 -4179  4180 -1006  4183 0

c  -1+1 --> 0
c    ( b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧  p_1006) -> (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧ -b^{1, 1007}_0)
c  in CNF:
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_2
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_1
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_0
c  in DIMACS:
-4178  4179 -4180 -1006 -4181 0
-4178  4179 -4180 -1006 -4182 0
-4178  4179 -4180 -1006 -4183 0

c  0+1 --> 1
c    (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧  p_1006) -> (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0)
c  in CNF:
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_2
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_1
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨  b^{1, 1007}_0
c  in DIMACS:
 4178  4179  4180 -1006 -4181 0
 4178  4179  4180 -1006 -4182 0
 4178  4179  4180 -1006  4183 0

c  1+1 --> 2
c    (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧  p_1006) -> (-b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0)
c  in CNF:
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_2
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨  b^{1, 1007}_1
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ -p_1006 ∨ -b^{1, 1007}_0
c  in DIMACS:
 4178  4179 -4180 -1006 -4181 0
 4178  4179 -4180 -1006  4182 0
 4178  4179 -4180 -1006 -4183 0

c  2+1 --> break 
c    (-b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧  p_1006) -> break
c  in CNF:
c     b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ -p_1006 ∨ break
c  in DIMACS:
 4178 -4179  4180 -1006 1162 0


c  2-1 --> 1
c    (-b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧ -p_1006) -> (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0)
c  in CNF:
c     b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_2
c     b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_1
c     b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨  b^{1, 1007}_0
c  in DIMACS:
 4178 -4179  4180  1006 -4181 0
 4178 -4179  4180  1006 -4182 0
 4178 -4179  4180  1006  4183 0

c  1-1 --> 0
c    (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧ -p_1006) -> (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧ -b^{1, 1007}_0)
c  in CNF:
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_2
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_1
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_0
c  in DIMACS:
 4178  4179 -4180  1006 -4181 0
 4178  4179 -4180  1006 -4182 0
 4178  4179 -4180  1006 -4183 0

c  0-1 --> -1
c    (-b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧ -p_1006) -> ( b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0)
c  in CNF:
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨  b^{1, 1007}_2
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_1
c     b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨  b^{1, 1007}_0
c  in DIMACS:
 4178  4179  4180  1006  4181 0
 4178  4179  4180  1006 -4182 0
 4178  4179  4180  1006  4183 0

c  -1-1 --> -2
c    ( b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧ -p_1006) -> ( b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0)
c  in CNF:
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨  b^{1, 1007}_2
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨  b^{1, 1007}_1
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨  p_1006 ∨ -b^{1, 1007}_0
c  in DIMACS:
-4178  4179 -4180  1006  4181 0
-4178  4179 -4180  1006  4182 0
-4178  4179 -4180  1006 -4183 0

c  -2-1 --> break 
c    ( b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧ -p_1006) -> break
c  in CNF:
c    -b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨  p_1006 ∨ break
c  in DIMACS:
-4178 -4179  4180  1006 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1006}_2 ∧ -b^{1, 1006}_1 ∧ -b^{1, 1006}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1006}_2 ∨  b^{1, 1006}_1 ∨  b^{1, 1006}_0 ∨ false 
c  in DIMACS:
-4178  4179  4180  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧ true) 
c  in CNF:
c     b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ false 
c  in DIMACS:
 4178 -4179 -4180  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1006}_2 ∧  b^{1, 1006}_1 ∧  b^{1, 1006}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1006}_2 ∨ -b^{1, 1006}_1 ∨ -b^{1, 1006}_0 ∨ false 
c  in DIMACS:
-4178 -4179 -4180  0

c i = 1007
c  -2+1 --> -1
c    ( b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧  p_1007) -> ( b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0)
c  in CNF:
c    -b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨  b^{1, 1008}_2
c    -b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_1
c    -b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨  b^{1, 1008}_0
c  in DIMACS:
-4181 -4182  4183 -1007  4184 0
-4181 -4182  4183 -1007 -4185 0
-4181 -4182  4183 -1007  4186 0

c  -1+1 --> 0
c    ( b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧  p_1007) -> (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧ -b^{1, 1008}_0)
c  in CNF:
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_2
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_1
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_0
c  in DIMACS:
-4181  4182 -4183 -1007 -4184 0
-4181  4182 -4183 -1007 -4185 0
-4181  4182 -4183 -1007 -4186 0

c  0+1 --> 1
c    (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧  p_1007) -> (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0)
c  in CNF:
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_2
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_1
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨  b^{1, 1008}_0
c  in DIMACS:
 4181  4182  4183 -1007 -4184 0
 4181  4182  4183 -1007 -4185 0
 4181  4182  4183 -1007  4186 0

c  1+1 --> 2
c    (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧  p_1007) -> (-b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0)
c  in CNF:
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_2
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨  b^{1, 1008}_1
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ -p_1007 ∨ -b^{1, 1008}_0
c  in DIMACS:
 4181  4182 -4183 -1007 -4184 0
 4181  4182 -4183 -1007  4185 0
 4181  4182 -4183 -1007 -4186 0

c  2+1 --> break 
c    (-b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧  p_1007) -> break
c  in CNF:
c     b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ -p_1007 ∨ break
c  in DIMACS:
 4181 -4182  4183 -1007 1162 0


c  2-1 --> 1
c    (-b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧ -p_1007) -> (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0)
c  in CNF:
c     b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_2
c     b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_1
c     b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨  b^{1, 1008}_0
c  in DIMACS:
 4181 -4182  4183  1007 -4184 0
 4181 -4182  4183  1007 -4185 0
 4181 -4182  4183  1007  4186 0

c  1-1 --> 0
c    (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧ -p_1007) -> (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧ -b^{1, 1008}_0)
c  in CNF:
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_2
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_1
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_0
c  in DIMACS:
 4181  4182 -4183  1007 -4184 0
 4181  4182 -4183  1007 -4185 0
 4181  4182 -4183  1007 -4186 0

c  0-1 --> -1
c    (-b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧ -p_1007) -> ( b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0)
c  in CNF:
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨  b^{1, 1008}_2
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_1
c     b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨  b^{1, 1008}_0
c  in DIMACS:
 4181  4182  4183  1007  4184 0
 4181  4182  4183  1007 -4185 0
 4181  4182  4183  1007  4186 0

c  -1-1 --> -2
c    ( b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧ -p_1007) -> ( b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0)
c  in CNF:
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨  b^{1, 1008}_2
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨  b^{1, 1008}_1
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨  p_1007 ∨ -b^{1, 1008}_0
c  in DIMACS:
-4181  4182 -4183  1007  4184 0
-4181  4182 -4183  1007  4185 0
-4181  4182 -4183  1007 -4186 0

c  -2-1 --> break 
c    ( b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧ -p_1007) -> break
c  in CNF:
c    -b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨  p_1007 ∨ break
c  in DIMACS:
-4181 -4182  4183  1007 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1007}_2 ∧ -b^{1, 1007}_1 ∧ -b^{1, 1007}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1007}_2 ∨  b^{1, 1007}_1 ∨  b^{1, 1007}_0 ∨ false 
c  in DIMACS:
-4181  4182  4183  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧ true) 
c  in CNF:
c     b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ false 
c  in DIMACS:
 4181 -4182 -4183  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1007}_2 ∧  b^{1, 1007}_1 ∧  b^{1, 1007}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1007}_2 ∨ -b^{1, 1007}_1 ∨ -b^{1, 1007}_0 ∨ false 
c  in DIMACS:
-4181 -4182 -4183  0

c i = 1008
c  -2+1 --> -1
c    ( b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧  p_1008) -> ( b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0)
c  in CNF:
c    -b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨  b^{1, 1009}_2
c    -b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_1
c    -b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨  b^{1, 1009}_0
c  in DIMACS:
-4184 -4185  4186 -1008  4187 0
-4184 -4185  4186 -1008 -4188 0
-4184 -4185  4186 -1008  4189 0

c  -1+1 --> 0
c    ( b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧  p_1008) -> (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧ -b^{1, 1009}_0)
c  in CNF:
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_2
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_1
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_0
c  in DIMACS:
-4184  4185 -4186 -1008 -4187 0
-4184  4185 -4186 -1008 -4188 0
-4184  4185 -4186 -1008 -4189 0

c  0+1 --> 1
c    (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧  p_1008) -> (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0)
c  in CNF:
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_2
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_1
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨  b^{1, 1009}_0
c  in DIMACS:
 4184  4185  4186 -1008 -4187 0
 4184  4185  4186 -1008 -4188 0
 4184  4185  4186 -1008  4189 0

c  1+1 --> 2
c    (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧  p_1008) -> (-b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0)
c  in CNF:
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_2
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨  b^{1, 1009}_1
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ -p_1008 ∨ -b^{1, 1009}_0
c  in DIMACS:
 4184  4185 -4186 -1008 -4187 0
 4184  4185 -4186 -1008  4188 0
 4184  4185 -4186 -1008 -4189 0

c  2+1 --> break 
c    (-b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 4184 -4185  4186 -1008 1162 0


c  2-1 --> 1
c    (-b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧ -p_1008) -> (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0)
c  in CNF:
c     b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_2
c     b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_1
c     b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨  b^{1, 1009}_0
c  in DIMACS:
 4184 -4185  4186  1008 -4187 0
 4184 -4185  4186  1008 -4188 0
 4184 -4185  4186  1008  4189 0

c  1-1 --> 0
c    (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧ -p_1008) -> (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧ -b^{1, 1009}_0)
c  in CNF:
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_2
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_1
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_0
c  in DIMACS:
 4184  4185 -4186  1008 -4187 0
 4184  4185 -4186  1008 -4188 0
 4184  4185 -4186  1008 -4189 0

c  0-1 --> -1
c    (-b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧ -p_1008) -> ( b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0)
c  in CNF:
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨  b^{1, 1009}_2
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_1
c     b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨  b^{1, 1009}_0
c  in DIMACS:
 4184  4185  4186  1008  4187 0
 4184  4185  4186  1008 -4188 0
 4184  4185  4186  1008  4189 0

c  -1-1 --> -2
c    ( b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧ -p_1008) -> ( b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0)
c  in CNF:
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨  b^{1, 1009}_2
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨  b^{1, 1009}_1
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨  p_1008 ∨ -b^{1, 1009}_0
c  in DIMACS:
-4184  4185 -4186  1008  4187 0
-4184  4185 -4186  1008  4188 0
-4184  4185 -4186  1008 -4189 0

c  -2-1 --> break 
c    ( b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-4184 -4185  4186  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1008}_2 ∧ -b^{1, 1008}_1 ∧ -b^{1, 1008}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1008}_2 ∨  b^{1, 1008}_1 ∨  b^{1, 1008}_0 ∨ false 
c  in DIMACS:
-4184  4185  4186  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧ true) 
c  in CNF:
c     b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ false 
c  in DIMACS:
 4184 -4185 -4186  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1008}_2 ∧  b^{1, 1008}_1 ∧  b^{1, 1008}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1008}_2 ∨ -b^{1, 1008}_1 ∨ -b^{1, 1008}_0 ∨ false 
c  in DIMACS:
-4184 -4185 -4186  0

c i = 1009
c  -2+1 --> -1
c    ( b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧  p_1009) -> ( b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0)
c  in CNF:
c    -b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨  b^{1, 1010}_2
c    -b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_1
c    -b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨  b^{1, 1010}_0
c  in DIMACS:
-4187 -4188  4189 -1009  4190 0
-4187 -4188  4189 -1009 -4191 0
-4187 -4188  4189 -1009  4192 0

c  -1+1 --> 0
c    ( b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧  p_1009) -> (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧ -b^{1, 1010}_0)
c  in CNF:
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_2
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_1
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_0
c  in DIMACS:
-4187  4188 -4189 -1009 -4190 0
-4187  4188 -4189 -1009 -4191 0
-4187  4188 -4189 -1009 -4192 0

c  0+1 --> 1
c    (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧  p_1009) -> (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0)
c  in CNF:
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_2
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_1
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨  b^{1, 1010}_0
c  in DIMACS:
 4187  4188  4189 -1009 -4190 0
 4187  4188  4189 -1009 -4191 0
 4187  4188  4189 -1009  4192 0

c  1+1 --> 2
c    (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧  p_1009) -> (-b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0)
c  in CNF:
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_2
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨  b^{1, 1010}_1
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ -p_1009 ∨ -b^{1, 1010}_0
c  in DIMACS:
 4187  4188 -4189 -1009 -4190 0
 4187  4188 -4189 -1009  4191 0
 4187  4188 -4189 -1009 -4192 0

c  2+1 --> break 
c    (-b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧  p_1009) -> break
c  in CNF:
c     b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ -p_1009 ∨ break
c  in DIMACS:
 4187 -4188  4189 -1009 1162 0


c  2-1 --> 1
c    (-b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧ -p_1009) -> (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0)
c  in CNF:
c     b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_2
c     b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_1
c     b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨  b^{1, 1010}_0
c  in DIMACS:
 4187 -4188  4189  1009 -4190 0
 4187 -4188  4189  1009 -4191 0
 4187 -4188  4189  1009  4192 0

c  1-1 --> 0
c    (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧ -p_1009) -> (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧ -b^{1, 1010}_0)
c  in CNF:
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_2
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_1
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_0
c  in DIMACS:
 4187  4188 -4189  1009 -4190 0
 4187  4188 -4189  1009 -4191 0
 4187  4188 -4189  1009 -4192 0

c  0-1 --> -1
c    (-b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧ -p_1009) -> ( b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0)
c  in CNF:
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨  b^{1, 1010}_2
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_1
c     b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨  b^{1, 1010}_0
c  in DIMACS:
 4187  4188  4189  1009  4190 0
 4187  4188  4189  1009 -4191 0
 4187  4188  4189  1009  4192 0

c  -1-1 --> -2
c    ( b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧ -p_1009) -> ( b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0)
c  in CNF:
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨  b^{1, 1010}_2
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨  b^{1, 1010}_1
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨  p_1009 ∨ -b^{1, 1010}_0
c  in DIMACS:
-4187  4188 -4189  1009  4190 0
-4187  4188 -4189  1009  4191 0
-4187  4188 -4189  1009 -4192 0

c  -2-1 --> break 
c    ( b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧ -p_1009) -> break
c  in CNF:
c    -b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨  p_1009 ∨ break
c  in DIMACS:
-4187 -4188  4189  1009 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1009}_2 ∧ -b^{1, 1009}_1 ∧ -b^{1, 1009}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1009}_2 ∨  b^{1, 1009}_1 ∨  b^{1, 1009}_0 ∨ false 
c  in DIMACS:
-4187  4188  4189  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧ true) 
c  in CNF:
c     b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ false 
c  in DIMACS:
 4187 -4188 -4189  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1009}_2 ∧  b^{1, 1009}_1 ∧  b^{1, 1009}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1009}_2 ∨ -b^{1, 1009}_1 ∨ -b^{1, 1009}_0 ∨ false 
c  in DIMACS:
-4187 -4188 -4189  0

c i = 1010
c  -2+1 --> -1
c    ( b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧  p_1010) -> ( b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0)
c  in CNF:
c    -b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨  b^{1, 1011}_2
c    -b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_1
c    -b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨  b^{1, 1011}_0
c  in DIMACS:
-4190 -4191  4192 -1010  4193 0
-4190 -4191  4192 -1010 -4194 0
-4190 -4191  4192 -1010  4195 0

c  -1+1 --> 0
c    ( b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧  p_1010) -> (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧ -b^{1, 1011}_0)
c  in CNF:
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_2
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_1
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_0
c  in DIMACS:
-4190  4191 -4192 -1010 -4193 0
-4190  4191 -4192 -1010 -4194 0
-4190  4191 -4192 -1010 -4195 0

c  0+1 --> 1
c    (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧  p_1010) -> (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0)
c  in CNF:
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_2
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_1
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨  b^{1, 1011}_0
c  in DIMACS:
 4190  4191  4192 -1010 -4193 0
 4190  4191  4192 -1010 -4194 0
 4190  4191  4192 -1010  4195 0

c  1+1 --> 2
c    (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧  p_1010) -> (-b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0)
c  in CNF:
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_2
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨  b^{1, 1011}_1
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ -p_1010 ∨ -b^{1, 1011}_0
c  in DIMACS:
 4190  4191 -4192 -1010 -4193 0
 4190  4191 -4192 -1010  4194 0
 4190  4191 -4192 -1010 -4195 0

c  2+1 --> break 
c    (-b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 4190 -4191  4192 -1010 1162 0


c  2-1 --> 1
c    (-b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧ -p_1010) -> (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0)
c  in CNF:
c     b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_2
c     b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_1
c     b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨  b^{1, 1011}_0
c  in DIMACS:
 4190 -4191  4192  1010 -4193 0
 4190 -4191  4192  1010 -4194 0
 4190 -4191  4192  1010  4195 0

c  1-1 --> 0
c    (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧ -p_1010) -> (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧ -b^{1, 1011}_0)
c  in CNF:
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_2
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_1
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_0
c  in DIMACS:
 4190  4191 -4192  1010 -4193 0
 4190  4191 -4192  1010 -4194 0
 4190  4191 -4192  1010 -4195 0

c  0-1 --> -1
c    (-b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧ -p_1010) -> ( b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0)
c  in CNF:
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨  b^{1, 1011}_2
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_1
c     b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨  b^{1, 1011}_0
c  in DIMACS:
 4190  4191  4192  1010  4193 0
 4190  4191  4192  1010 -4194 0
 4190  4191  4192  1010  4195 0

c  -1-1 --> -2
c    ( b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧ -p_1010) -> ( b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0)
c  in CNF:
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨  b^{1, 1011}_2
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨  b^{1, 1011}_1
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨  p_1010 ∨ -b^{1, 1011}_0
c  in DIMACS:
-4190  4191 -4192  1010  4193 0
-4190  4191 -4192  1010  4194 0
-4190  4191 -4192  1010 -4195 0

c  -2-1 --> break 
c    ( b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-4190 -4191  4192  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1010}_2 ∧ -b^{1, 1010}_1 ∧ -b^{1, 1010}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1010}_2 ∨  b^{1, 1010}_1 ∨  b^{1, 1010}_0 ∨ false 
c  in DIMACS:
-4190  4191  4192  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧ true) 
c  in CNF:
c     b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ false 
c  in DIMACS:
 4190 -4191 -4192  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1010}_2 ∧  b^{1, 1010}_1 ∧  b^{1, 1010}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1010}_2 ∨ -b^{1, 1010}_1 ∨ -b^{1, 1010}_0 ∨ false 
c  in DIMACS:
-4190 -4191 -4192  0

c i = 1011
c  -2+1 --> -1
c    ( b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧  p_1011) -> ( b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0)
c  in CNF:
c    -b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨  b^{1, 1012}_2
c    -b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_1
c    -b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨  b^{1, 1012}_0
c  in DIMACS:
-4193 -4194  4195 -1011  4196 0
-4193 -4194  4195 -1011 -4197 0
-4193 -4194  4195 -1011  4198 0

c  -1+1 --> 0
c    ( b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧  p_1011) -> (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧ -b^{1, 1012}_0)
c  in CNF:
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_2
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_1
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_0
c  in DIMACS:
-4193  4194 -4195 -1011 -4196 0
-4193  4194 -4195 -1011 -4197 0
-4193  4194 -4195 -1011 -4198 0

c  0+1 --> 1
c    (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧  p_1011) -> (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0)
c  in CNF:
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_2
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_1
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨  b^{1, 1012}_0
c  in DIMACS:
 4193  4194  4195 -1011 -4196 0
 4193  4194  4195 -1011 -4197 0
 4193  4194  4195 -1011  4198 0

c  1+1 --> 2
c    (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧  p_1011) -> (-b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0)
c  in CNF:
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_2
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨  b^{1, 1012}_1
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ -p_1011 ∨ -b^{1, 1012}_0
c  in DIMACS:
 4193  4194 -4195 -1011 -4196 0
 4193  4194 -4195 -1011  4197 0
 4193  4194 -4195 -1011 -4198 0

c  2+1 --> break 
c    (-b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧  p_1011) -> break
c  in CNF:
c     b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ -p_1011 ∨ break
c  in DIMACS:
 4193 -4194  4195 -1011 1162 0


c  2-1 --> 1
c    (-b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧ -p_1011) -> (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0)
c  in CNF:
c     b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_2
c     b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_1
c     b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨  b^{1, 1012}_0
c  in DIMACS:
 4193 -4194  4195  1011 -4196 0
 4193 -4194  4195  1011 -4197 0
 4193 -4194  4195  1011  4198 0

c  1-1 --> 0
c    (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧ -p_1011) -> (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧ -b^{1, 1012}_0)
c  in CNF:
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_2
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_1
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_0
c  in DIMACS:
 4193  4194 -4195  1011 -4196 0
 4193  4194 -4195  1011 -4197 0
 4193  4194 -4195  1011 -4198 0

c  0-1 --> -1
c    (-b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧ -p_1011) -> ( b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0)
c  in CNF:
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨  b^{1, 1012}_2
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_1
c     b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨  b^{1, 1012}_0
c  in DIMACS:
 4193  4194  4195  1011  4196 0
 4193  4194  4195  1011 -4197 0
 4193  4194  4195  1011  4198 0

c  -1-1 --> -2
c    ( b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧ -p_1011) -> ( b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0)
c  in CNF:
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨  b^{1, 1012}_2
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨  b^{1, 1012}_1
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨  p_1011 ∨ -b^{1, 1012}_0
c  in DIMACS:
-4193  4194 -4195  1011  4196 0
-4193  4194 -4195  1011  4197 0
-4193  4194 -4195  1011 -4198 0

c  -2-1 --> break 
c    ( b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧ -p_1011) -> break
c  in CNF:
c    -b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨  p_1011 ∨ break
c  in DIMACS:
-4193 -4194  4195  1011 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1011}_2 ∧ -b^{1, 1011}_1 ∧ -b^{1, 1011}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1011}_2 ∨  b^{1, 1011}_1 ∨  b^{1, 1011}_0 ∨ false 
c  in DIMACS:
-4193  4194  4195  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧ true) 
c  in CNF:
c     b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ false 
c  in DIMACS:
 4193 -4194 -4195  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1011}_2 ∧  b^{1, 1011}_1 ∧  b^{1, 1011}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1011}_2 ∨ -b^{1, 1011}_1 ∨ -b^{1, 1011}_0 ∨ false 
c  in DIMACS:
-4193 -4194 -4195  0

c i = 1012
c  -2+1 --> -1
c    ( b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧  p_1012) -> ( b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0)
c  in CNF:
c    -b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨  b^{1, 1013}_2
c    -b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_1
c    -b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨  b^{1, 1013}_0
c  in DIMACS:
-4196 -4197  4198 -1012  4199 0
-4196 -4197  4198 -1012 -4200 0
-4196 -4197  4198 -1012  4201 0

c  -1+1 --> 0
c    ( b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧  p_1012) -> (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧ -b^{1, 1013}_0)
c  in CNF:
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_2
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_1
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_0
c  in DIMACS:
-4196  4197 -4198 -1012 -4199 0
-4196  4197 -4198 -1012 -4200 0
-4196  4197 -4198 -1012 -4201 0

c  0+1 --> 1
c    (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧  p_1012) -> (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0)
c  in CNF:
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_2
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_1
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨  b^{1, 1013}_0
c  in DIMACS:
 4196  4197  4198 -1012 -4199 0
 4196  4197  4198 -1012 -4200 0
 4196  4197  4198 -1012  4201 0

c  1+1 --> 2
c    (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧  p_1012) -> (-b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0)
c  in CNF:
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_2
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨  b^{1, 1013}_1
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ -p_1012 ∨ -b^{1, 1013}_0
c  in DIMACS:
 4196  4197 -4198 -1012 -4199 0
 4196  4197 -4198 -1012  4200 0
 4196  4197 -4198 -1012 -4201 0

c  2+1 --> break 
c    (-b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 4196 -4197  4198 -1012 1162 0


c  2-1 --> 1
c    (-b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧ -p_1012) -> (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0)
c  in CNF:
c     b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_2
c     b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_1
c     b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨  b^{1, 1013}_0
c  in DIMACS:
 4196 -4197  4198  1012 -4199 0
 4196 -4197  4198  1012 -4200 0
 4196 -4197  4198  1012  4201 0

c  1-1 --> 0
c    (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧ -p_1012) -> (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧ -b^{1, 1013}_0)
c  in CNF:
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_2
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_1
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_0
c  in DIMACS:
 4196  4197 -4198  1012 -4199 0
 4196  4197 -4198  1012 -4200 0
 4196  4197 -4198  1012 -4201 0

c  0-1 --> -1
c    (-b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧ -p_1012) -> ( b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0)
c  in CNF:
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨  b^{1, 1013}_2
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_1
c     b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨  b^{1, 1013}_0
c  in DIMACS:
 4196  4197  4198  1012  4199 0
 4196  4197  4198  1012 -4200 0
 4196  4197  4198  1012  4201 0

c  -1-1 --> -2
c    ( b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧ -p_1012) -> ( b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0)
c  in CNF:
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨  b^{1, 1013}_2
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨  b^{1, 1013}_1
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨  p_1012 ∨ -b^{1, 1013}_0
c  in DIMACS:
-4196  4197 -4198  1012  4199 0
-4196  4197 -4198  1012  4200 0
-4196  4197 -4198  1012 -4201 0

c  -2-1 --> break 
c    ( b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-4196 -4197  4198  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1012}_2 ∧ -b^{1, 1012}_1 ∧ -b^{1, 1012}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1012}_2 ∨  b^{1, 1012}_1 ∨  b^{1, 1012}_0 ∨ false 
c  in DIMACS:
-4196  4197  4198  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧ true) 
c  in CNF:
c     b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ false 
c  in DIMACS:
 4196 -4197 -4198  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1012}_2 ∧  b^{1, 1012}_1 ∧  b^{1, 1012}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1012}_2 ∨ -b^{1, 1012}_1 ∨ -b^{1, 1012}_0 ∨ false 
c  in DIMACS:
-4196 -4197 -4198  0

c i = 1013
c  -2+1 --> -1
c    ( b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧  p_1013) -> ( b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0)
c  in CNF:
c    -b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨  b^{1, 1014}_2
c    -b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_1
c    -b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨  b^{1, 1014}_0
c  in DIMACS:
-4199 -4200  4201 -1013  4202 0
-4199 -4200  4201 -1013 -4203 0
-4199 -4200  4201 -1013  4204 0

c  -1+1 --> 0
c    ( b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧  p_1013) -> (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧ -b^{1, 1014}_0)
c  in CNF:
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_2
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_1
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_0
c  in DIMACS:
-4199  4200 -4201 -1013 -4202 0
-4199  4200 -4201 -1013 -4203 0
-4199  4200 -4201 -1013 -4204 0

c  0+1 --> 1
c    (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧  p_1013) -> (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0)
c  in CNF:
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_2
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_1
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨  b^{1, 1014}_0
c  in DIMACS:
 4199  4200  4201 -1013 -4202 0
 4199  4200  4201 -1013 -4203 0
 4199  4200  4201 -1013  4204 0

c  1+1 --> 2
c    (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧  p_1013) -> (-b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0)
c  in CNF:
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_2
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨  b^{1, 1014}_1
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ -p_1013 ∨ -b^{1, 1014}_0
c  in DIMACS:
 4199  4200 -4201 -1013 -4202 0
 4199  4200 -4201 -1013  4203 0
 4199  4200 -4201 -1013 -4204 0

c  2+1 --> break 
c    (-b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧  p_1013) -> break
c  in CNF:
c     b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ -p_1013 ∨ break
c  in DIMACS:
 4199 -4200  4201 -1013 1162 0


c  2-1 --> 1
c    (-b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧ -p_1013) -> (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0)
c  in CNF:
c     b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_2
c     b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_1
c     b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨  b^{1, 1014}_0
c  in DIMACS:
 4199 -4200  4201  1013 -4202 0
 4199 -4200  4201  1013 -4203 0
 4199 -4200  4201  1013  4204 0

c  1-1 --> 0
c    (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧ -p_1013) -> (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧ -b^{1, 1014}_0)
c  in CNF:
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_2
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_1
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_0
c  in DIMACS:
 4199  4200 -4201  1013 -4202 0
 4199  4200 -4201  1013 -4203 0
 4199  4200 -4201  1013 -4204 0

c  0-1 --> -1
c    (-b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧ -p_1013) -> ( b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0)
c  in CNF:
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨  b^{1, 1014}_2
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_1
c     b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨  b^{1, 1014}_0
c  in DIMACS:
 4199  4200  4201  1013  4202 0
 4199  4200  4201  1013 -4203 0
 4199  4200  4201  1013  4204 0

c  -1-1 --> -2
c    ( b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧ -p_1013) -> ( b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0)
c  in CNF:
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨  b^{1, 1014}_2
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨  b^{1, 1014}_1
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨  p_1013 ∨ -b^{1, 1014}_0
c  in DIMACS:
-4199  4200 -4201  1013  4202 0
-4199  4200 -4201  1013  4203 0
-4199  4200 -4201  1013 -4204 0

c  -2-1 --> break 
c    ( b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧ -p_1013) -> break
c  in CNF:
c    -b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨  p_1013 ∨ break
c  in DIMACS:
-4199 -4200  4201  1013 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1013}_2 ∧ -b^{1, 1013}_1 ∧ -b^{1, 1013}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1013}_2 ∨  b^{1, 1013}_1 ∨  b^{1, 1013}_0 ∨ false 
c  in DIMACS:
-4199  4200  4201  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧ true) 
c  in CNF:
c     b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ false 
c  in DIMACS:
 4199 -4200 -4201  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1013}_2 ∧  b^{1, 1013}_1 ∧  b^{1, 1013}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1013}_2 ∨ -b^{1, 1013}_1 ∨ -b^{1, 1013}_0 ∨ false 
c  in DIMACS:
-4199 -4200 -4201  0

c i = 1014
c  -2+1 --> -1
c    ( b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧  p_1014) -> ( b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0)
c  in CNF:
c    -b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨  b^{1, 1015}_2
c    -b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_1
c    -b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨  b^{1, 1015}_0
c  in DIMACS:
-4202 -4203  4204 -1014  4205 0
-4202 -4203  4204 -1014 -4206 0
-4202 -4203  4204 -1014  4207 0

c  -1+1 --> 0
c    ( b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧  p_1014) -> (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧ -b^{1, 1015}_0)
c  in CNF:
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_2
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_1
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_0
c  in DIMACS:
-4202  4203 -4204 -1014 -4205 0
-4202  4203 -4204 -1014 -4206 0
-4202  4203 -4204 -1014 -4207 0

c  0+1 --> 1
c    (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧  p_1014) -> (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0)
c  in CNF:
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_2
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_1
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨  b^{1, 1015}_0
c  in DIMACS:
 4202  4203  4204 -1014 -4205 0
 4202  4203  4204 -1014 -4206 0
 4202  4203  4204 -1014  4207 0

c  1+1 --> 2
c    (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧  p_1014) -> (-b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0)
c  in CNF:
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_2
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨  b^{1, 1015}_1
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ -p_1014 ∨ -b^{1, 1015}_0
c  in DIMACS:
 4202  4203 -4204 -1014 -4205 0
 4202  4203 -4204 -1014  4206 0
 4202  4203 -4204 -1014 -4207 0

c  2+1 --> break 
c    (-b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 4202 -4203  4204 -1014 1162 0


c  2-1 --> 1
c    (-b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧ -p_1014) -> (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0)
c  in CNF:
c     b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_2
c     b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_1
c     b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨  b^{1, 1015}_0
c  in DIMACS:
 4202 -4203  4204  1014 -4205 0
 4202 -4203  4204  1014 -4206 0
 4202 -4203  4204  1014  4207 0

c  1-1 --> 0
c    (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧ -p_1014) -> (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧ -b^{1, 1015}_0)
c  in CNF:
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_2
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_1
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_0
c  in DIMACS:
 4202  4203 -4204  1014 -4205 0
 4202  4203 -4204  1014 -4206 0
 4202  4203 -4204  1014 -4207 0

c  0-1 --> -1
c    (-b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧ -p_1014) -> ( b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0)
c  in CNF:
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨  b^{1, 1015}_2
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_1
c     b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨  b^{1, 1015}_0
c  in DIMACS:
 4202  4203  4204  1014  4205 0
 4202  4203  4204  1014 -4206 0
 4202  4203  4204  1014  4207 0

c  -1-1 --> -2
c    ( b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧ -p_1014) -> ( b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0)
c  in CNF:
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨  b^{1, 1015}_2
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨  b^{1, 1015}_1
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨  p_1014 ∨ -b^{1, 1015}_0
c  in DIMACS:
-4202  4203 -4204  1014  4205 0
-4202  4203 -4204  1014  4206 0
-4202  4203 -4204  1014 -4207 0

c  -2-1 --> break 
c    ( b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-4202 -4203  4204  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1014}_2 ∧ -b^{1, 1014}_1 ∧ -b^{1, 1014}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1014}_2 ∨  b^{1, 1014}_1 ∨  b^{1, 1014}_0 ∨ false 
c  in DIMACS:
-4202  4203  4204  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧ true) 
c  in CNF:
c     b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ false 
c  in DIMACS:
 4202 -4203 -4204  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1014}_2 ∧  b^{1, 1014}_1 ∧  b^{1, 1014}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1014}_2 ∨ -b^{1, 1014}_1 ∨ -b^{1, 1014}_0 ∨ false 
c  in DIMACS:
-4202 -4203 -4204  0

c i = 1015
c  -2+1 --> -1
c    ( b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧  p_1015) -> ( b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0)
c  in CNF:
c    -b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨  b^{1, 1016}_2
c    -b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_1
c    -b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨  b^{1, 1016}_0
c  in DIMACS:
-4205 -4206  4207 -1015  4208 0
-4205 -4206  4207 -1015 -4209 0
-4205 -4206  4207 -1015  4210 0

c  -1+1 --> 0
c    ( b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧  p_1015) -> (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧ -b^{1, 1016}_0)
c  in CNF:
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_2
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_1
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_0
c  in DIMACS:
-4205  4206 -4207 -1015 -4208 0
-4205  4206 -4207 -1015 -4209 0
-4205  4206 -4207 -1015 -4210 0

c  0+1 --> 1
c    (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧  p_1015) -> (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0)
c  in CNF:
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_2
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_1
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨  b^{1, 1016}_0
c  in DIMACS:
 4205  4206  4207 -1015 -4208 0
 4205  4206  4207 -1015 -4209 0
 4205  4206  4207 -1015  4210 0

c  1+1 --> 2
c    (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧  p_1015) -> (-b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0)
c  in CNF:
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_2
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨  b^{1, 1016}_1
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ -p_1015 ∨ -b^{1, 1016}_0
c  in DIMACS:
 4205  4206 -4207 -1015 -4208 0
 4205  4206 -4207 -1015  4209 0
 4205  4206 -4207 -1015 -4210 0

c  2+1 --> break 
c    (-b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 4205 -4206  4207 -1015 1162 0


c  2-1 --> 1
c    (-b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧ -p_1015) -> (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0)
c  in CNF:
c     b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_2
c     b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_1
c     b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨  b^{1, 1016}_0
c  in DIMACS:
 4205 -4206  4207  1015 -4208 0
 4205 -4206  4207  1015 -4209 0
 4205 -4206  4207  1015  4210 0

c  1-1 --> 0
c    (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧ -p_1015) -> (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧ -b^{1, 1016}_0)
c  in CNF:
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_2
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_1
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_0
c  in DIMACS:
 4205  4206 -4207  1015 -4208 0
 4205  4206 -4207  1015 -4209 0
 4205  4206 -4207  1015 -4210 0

c  0-1 --> -1
c    (-b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧ -p_1015) -> ( b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0)
c  in CNF:
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨  b^{1, 1016}_2
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_1
c     b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨  b^{1, 1016}_0
c  in DIMACS:
 4205  4206  4207  1015  4208 0
 4205  4206  4207  1015 -4209 0
 4205  4206  4207  1015  4210 0

c  -1-1 --> -2
c    ( b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧ -p_1015) -> ( b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0)
c  in CNF:
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨  b^{1, 1016}_2
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨  b^{1, 1016}_1
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨  p_1015 ∨ -b^{1, 1016}_0
c  in DIMACS:
-4205  4206 -4207  1015  4208 0
-4205  4206 -4207  1015  4209 0
-4205  4206 -4207  1015 -4210 0

c  -2-1 --> break 
c    ( b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-4205 -4206  4207  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1015}_2 ∧ -b^{1, 1015}_1 ∧ -b^{1, 1015}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1015}_2 ∨  b^{1, 1015}_1 ∨  b^{1, 1015}_0 ∨ false 
c  in DIMACS:
-4205  4206  4207  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧ true) 
c  in CNF:
c     b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ false 
c  in DIMACS:
 4205 -4206 -4207  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1015}_2 ∧  b^{1, 1015}_1 ∧  b^{1, 1015}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1015}_2 ∨ -b^{1, 1015}_1 ∨ -b^{1, 1015}_0 ∨ false 
c  in DIMACS:
-4205 -4206 -4207  0

c i = 1016
c  -2+1 --> -1
c    ( b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧  p_1016) -> ( b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0)
c  in CNF:
c    -b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨  b^{1, 1017}_2
c    -b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_1
c    -b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨  b^{1, 1017}_0
c  in DIMACS:
-4208 -4209  4210 -1016  4211 0
-4208 -4209  4210 -1016 -4212 0
-4208 -4209  4210 -1016  4213 0

c  -1+1 --> 0
c    ( b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧  p_1016) -> (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧ -b^{1, 1017}_0)
c  in CNF:
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_2
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_1
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_0
c  in DIMACS:
-4208  4209 -4210 -1016 -4211 0
-4208  4209 -4210 -1016 -4212 0
-4208  4209 -4210 -1016 -4213 0

c  0+1 --> 1
c    (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧  p_1016) -> (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0)
c  in CNF:
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_2
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_1
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨  b^{1, 1017}_0
c  in DIMACS:
 4208  4209  4210 -1016 -4211 0
 4208  4209  4210 -1016 -4212 0
 4208  4209  4210 -1016  4213 0

c  1+1 --> 2
c    (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧  p_1016) -> (-b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0)
c  in CNF:
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_2
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨  b^{1, 1017}_1
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ -p_1016 ∨ -b^{1, 1017}_0
c  in DIMACS:
 4208  4209 -4210 -1016 -4211 0
 4208  4209 -4210 -1016  4212 0
 4208  4209 -4210 -1016 -4213 0

c  2+1 --> break 
c    (-b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 4208 -4209  4210 -1016 1162 0


c  2-1 --> 1
c    (-b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧ -p_1016) -> (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0)
c  in CNF:
c     b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_2
c     b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_1
c     b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨  b^{1, 1017}_0
c  in DIMACS:
 4208 -4209  4210  1016 -4211 0
 4208 -4209  4210  1016 -4212 0
 4208 -4209  4210  1016  4213 0

c  1-1 --> 0
c    (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧ -p_1016) -> (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧ -b^{1, 1017}_0)
c  in CNF:
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_2
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_1
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_0
c  in DIMACS:
 4208  4209 -4210  1016 -4211 0
 4208  4209 -4210  1016 -4212 0
 4208  4209 -4210  1016 -4213 0

c  0-1 --> -1
c    (-b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧ -p_1016) -> ( b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0)
c  in CNF:
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨  b^{1, 1017}_2
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_1
c     b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨  b^{1, 1017}_0
c  in DIMACS:
 4208  4209  4210  1016  4211 0
 4208  4209  4210  1016 -4212 0
 4208  4209  4210  1016  4213 0

c  -1-1 --> -2
c    ( b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧ -p_1016) -> ( b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0)
c  in CNF:
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨  b^{1, 1017}_2
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨  b^{1, 1017}_1
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨  p_1016 ∨ -b^{1, 1017}_0
c  in DIMACS:
-4208  4209 -4210  1016  4211 0
-4208  4209 -4210  1016  4212 0
-4208  4209 -4210  1016 -4213 0

c  -2-1 --> break 
c    ( b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-4208 -4209  4210  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1016}_2 ∧ -b^{1, 1016}_1 ∧ -b^{1, 1016}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1016}_2 ∨  b^{1, 1016}_1 ∨  b^{1, 1016}_0 ∨ false 
c  in DIMACS:
-4208  4209  4210  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧ true) 
c  in CNF:
c     b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ false 
c  in DIMACS:
 4208 -4209 -4210  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1016}_2 ∧  b^{1, 1016}_1 ∧  b^{1, 1016}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1016}_2 ∨ -b^{1, 1016}_1 ∨ -b^{1, 1016}_0 ∨ false 
c  in DIMACS:
-4208 -4209 -4210  0

c i = 1017
c  -2+1 --> -1
c    ( b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧  p_1017) -> ( b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0)
c  in CNF:
c    -b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨  b^{1, 1018}_2
c    -b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_1
c    -b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨  b^{1, 1018}_0
c  in DIMACS:
-4211 -4212  4213 -1017  4214 0
-4211 -4212  4213 -1017 -4215 0
-4211 -4212  4213 -1017  4216 0

c  -1+1 --> 0
c    ( b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧  p_1017) -> (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧ -b^{1, 1018}_0)
c  in CNF:
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_2
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_1
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_0
c  in DIMACS:
-4211  4212 -4213 -1017 -4214 0
-4211  4212 -4213 -1017 -4215 0
-4211  4212 -4213 -1017 -4216 0

c  0+1 --> 1
c    (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧  p_1017) -> (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0)
c  in CNF:
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_2
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_1
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨  b^{1, 1018}_0
c  in DIMACS:
 4211  4212  4213 -1017 -4214 0
 4211  4212  4213 -1017 -4215 0
 4211  4212  4213 -1017  4216 0

c  1+1 --> 2
c    (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧  p_1017) -> (-b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0)
c  in CNF:
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_2
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨  b^{1, 1018}_1
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ -p_1017 ∨ -b^{1, 1018}_0
c  in DIMACS:
 4211  4212 -4213 -1017 -4214 0
 4211  4212 -4213 -1017  4215 0
 4211  4212 -4213 -1017 -4216 0

c  2+1 --> break 
c    (-b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧  p_1017) -> break
c  in CNF:
c     b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ -p_1017 ∨ break
c  in DIMACS:
 4211 -4212  4213 -1017 1162 0


c  2-1 --> 1
c    (-b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧ -p_1017) -> (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0)
c  in CNF:
c     b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_2
c     b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_1
c     b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨  b^{1, 1018}_0
c  in DIMACS:
 4211 -4212  4213  1017 -4214 0
 4211 -4212  4213  1017 -4215 0
 4211 -4212  4213  1017  4216 0

c  1-1 --> 0
c    (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧ -p_1017) -> (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧ -b^{1, 1018}_0)
c  in CNF:
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_2
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_1
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_0
c  in DIMACS:
 4211  4212 -4213  1017 -4214 0
 4211  4212 -4213  1017 -4215 0
 4211  4212 -4213  1017 -4216 0

c  0-1 --> -1
c    (-b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧ -p_1017) -> ( b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0)
c  in CNF:
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨  b^{1, 1018}_2
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_1
c     b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨  b^{1, 1018}_0
c  in DIMACS:
 4211  4212  4213  1017  4214 0
 4211  4212  4213  1017 -4215 0
 4211  4212  4213  1017  4216 0

c  -1-1 --> -2
c    ( b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧ -p_1017) -> ( b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0)
c  in CNF:
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨  b^{1, 1018}_2
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨  b^{1, 1018}_1
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨  p_1017 ∨ -b^{1, 1018}_0
c  in DIMACS:
-4211  4212 -4213  1017  4214 0
-4211  4212 -4213  1017  4215 0
-4211  4212 -4213  1017 -4216 0

c  -2-1 --> break 
c    ( b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧ -p_1017) -> break
c  in CNF:
c    -b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨  p_1017 ∨ break
c  in DIMACS:
-4211 -4212  4213  1017 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1017}_2 ∧ -b^{1, 1017}_1 ∧ -b^{1, 1017}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1017}_2 ∨  b^{1, 1017}_1 ∨  b^{1, 1017}_0 ∨ false 
c  in DIMACS:
-4211  4212  4213  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧ true) 
c  in CNF:
c     b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ false 
c  in DIMACS:
 4211 -4212 -4213  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1017}_2 ∧  b^{1, 1017}_1 ∧  b^{1, 1017}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1017}_2 ∨ -b^{1, 1017}_1 ∨ -b^{1, 1017}_0 ∨ false 
c  in DIMACS:
-4211 -4212 -4213  0

c i = 1018
c  -2+1 --> -1
c    ( b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧  p_1018) -> ( b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0)
c  in CNF:
c    -b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨  b^{1, 1019}_2
c    -b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_1
c    -b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨  b^{1, 1019}_0
c  in DIMACS:
-4214 -4215  4216 -1018  4217 0
-4214 -4215  4216 -1018 -4218 0
-4214 -4215  4216 -1018  4219 0

c  -1+1 --> 0
c    ( b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧  p_1018) -> (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧ -b^{1, 1019}_0)
c  in CNF:
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_2
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_1
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_0
c  in DIMACS:
-4214  4215 -4216 -1018 -4217 0
-4214  4215 -4216 -1018 -4218 0
-4214  4215 -4216 -1018 -4219 0

c  0+1 --> 1
c    (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧  p_1018) -> (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0)
c  in CNF:
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_2
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_1
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨  b^{1, 1019}_0
c  in DIMACS:
 4214  4215  4216 -1018 -4217 0
 4214  4215  4216 -1018 -4218 0
 4214  4215  4216 -1018  4219 0

c  1+1 --> 2
c    (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧  p_1018) -> (-b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0)
c  in CNF:
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_2
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨  b^{1, 1019}_1
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ -p_1018 ∨ -b^{1, 1019}_0
c  in DIMACS:
 4214  4215 -4216 -1018 -4217 0
 4214  4215 -4216 -1018  4218 0
 4214  4215 -4216 -1018 -4219 0

c  2+1 --> break 
c    (-b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧  p_1018) -> break
c  in CNF:
c     b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ -p_1018 ∨ break
c  in DIMACS:
 4214 -4215  4216 -1018 1162 0


c  2-1 --> 1
c    (-b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧ -p_1018) -> (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0)
c  in CNF:
c     b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_2
c     b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_1
c     b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨  b^{1, 1019}_0
c  in DIMACS:
 4214 -4215  4216  1018 -4217 0
 4214 -4215  4216  1018 -4218 0
 4214 -4215  4216  1018  4219 0

c  1-1 --> 0
c    (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧ -p_1018) -> (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧ -b^{1, 1019}_0)
c  in CNF:
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_2
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_1
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_0
c  in DIMACS:
 4214  4215 -4216  1018 -4217 0
 4214  4215 -4216  1018 -4218 0
 4214  4215 -4216  1018 -4219 0

c  0-1 --> -1
c    (-b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧ -p_1018) -> ( b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0)
c  in CNF:
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨  b^{1, 1019}_2
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_1
c     b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨  b^{1, 1019}_0
c  in DIMACS:
 4214  4215  4216  1018  4217 0
 4214  4215  4216  1018 -4218 0
 4214  4215  4216  1018  4219 0

c  -1-1 --> -2
c    ( b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧ -p_1018) -> ( b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0)
c  in CNF:
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨  b^{1, 1019}_2
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨  b^{1, 1019}_1
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨  p_1018 ∨ -b^{1, 1019}_0
c  in DIMACS:
-4214  4215 -4216  1018  4217 0
-4214  4215 -4216  1018  4218 0
-4214  4215 -4216  1018 -4219 0

c  -2-1 --> break 
c    ( b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧ -p_1018) -> break
c  in CNF:
c    -b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨  p_1018 ∨ break
c  in DIMACS:
-4214 -4215  4216  1018 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1018}_2 ∧ -b^{1, 1018}_1 ∧ -b^{1, 1018}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1018}_2 ∨  b^{1, 1018}_1 ∨  b^{1, 1018}_0 ∨ false 
c  in DIMACS:
-4214  4215  4216  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧ true) 
c  in CNF:
c     b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ false 
c  in DIMACS:
 4214 -4215 -4216  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1018}_2 ∧  b^{1, 1018}_1 ∧  b^{1, 1018}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1018}_2 ∨ -b^{1, 1018}_1 ∨ -b^{1, 1018}_0 ∨ false 
c  in DIMACS:
-4214 -4215 -4216  0

c i = 1019
c  -2+1 --> -1
c    ( b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧  p_1019) -> ( b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0)
c  in CNF:
c    -b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨  b^{1, 1020}_2
c    -b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_1
c    -b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨  b^{1, 1020}_0
c  in DIMACS:
-4217 -4218  4219 -1019  4220 0
-4217 -4218  4219 -1019 -4221 0
-4217 -4218  4219 -1019  4222 0

c  -1+1 --> 0
c    ( b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧  p_1019) -> (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧ -b^{1, 1020}_0)
c  in CNF:
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_2
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_1
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_0
c  in DIMACS:
-4217  4218 -4219 -1019 -4220 0
-4217  4218 -4219 -1019 -4221 0
-4217  4218 -4219 -1019 -4222 0

c  0+1 --> 1
c    (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧  p_1019) -> (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0)
c  in CNF:
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_2
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_1
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨  b^{1, 1020}_0
c  in DIMACS:
 4217  4218  4219 -1019 -4220 0
 4217  4218  4219 -1019 -4221 0
 4217  4218  4219 -1019  4222 0

c  1+1 --> 2
c    (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧  p_1019) -> (-b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0)
c  in CNF:
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_2
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨  b^{1, 1020}_1
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ -p_1019 ∨ -b^{1, 1020}_0
c  in DIMACS:
 4217  4218 -4219 -1019 -4220 0
 4217  4218 -4219 -1019  4221 0
 4217  4218 -4219 -1019 -4222 0

c  2+1 --> break 
c    (-b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧  p_1019) -> break
c  in CNF:
c     b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ -p_1019 ∨ break
c  in DIMACS:
 4217 -4218  4219 -1019 1162 0


c  2-1 --> 1
c    (-b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧ -p_1019) -> (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0)
c  in CNF:
c     b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_2
c     b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_1
c     b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨  b^{1, 1020}_0
c  in DIMACS:
 4217 -4218  4219  1019 -4220 0
 4217 -4218  4219  1019 -4221 0
 4217 -4218  4219  1019  4222 0

c  1-1 --> 0
c    (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧ -p_1019) -> (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧ -b^{1, 1020}_0)
c  in CNF:
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_2
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_1
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_0
c  in DIMACS:
 4217  4218 -4219  1019 -4220 0
 4217  4218 -4219  1019 -4221 0
 4217  4218 -4219  1019 -4222 0

c  0-1 --> -1
c    (-b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧ -p_1019) -> ( b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0)
c  in CNF:
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨  b^{1, 1020}_2
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_1
c     b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨  b^{1, 1020}_0
c  in DIMACS:
 4217  4218  4219  1019  4220 0
 4217  4218  4219  1019 -4221 0
 4217  4218  4219  1019  4222 0

c  -1-1 --> -2
c    ( b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧ -p_1019) -> ( b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0)
c  in CNF:
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨  b^{1, 1020}_2
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨  b^{1, 1020}_1
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨  p_1019 ∨ -b^{1, 1020}_0
c  in DIMACS:
-4217  4218 -4219  1019  4220 0
-4217  4218 -4219  1019  4221 0
-4217  4218 -4219  1019 -4222 0

c  -2-1 --> break 
c    ( b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧ -p_1019) -> break
c  in CNF:
c    -b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨  p_1019 ∨ break
c  in DIMACS:
-4217 -4218  4219  1019 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1019}_2 ∧ -b^{1, 1019}_1 ∧ -b^{1, 1019}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1019}_2 ∨  b^{1, 1019}_1 ∨  b^{1, 1019}_0 ∨ false 
c  in DIMACS:
-4217  4218  4219  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧ true) 
c  in CNF:
c     b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ false 
c  in DIMACS:
 4217 -4218 -4219  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1019}_2 ∧  b^{1, 1019}_1 ∧  b^{1, 1019}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1019}_2 ∨ -b^{1, 1019}_1 ∨ -b^{1, 1019}_0 ∨ false 
c  in DIMACS:
-4217 -4218 -4219  0

c i = 1020
c  -2+1 --> -1
c    ( b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧  p_1020) -> ( b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0)
c  in CNF:
c    -b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨  b^{1, 1021}_2
c    -b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_1
c    -b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨  b^{1, 1021}_0
c  in DIMACS:
-4220 -4221  4222 -1020  4223 0
-4220 -4221  4222 -1020 -4224 0
-4220 -4221  4222 -1020  4225 0

c  -1+1 --> 0
c    ( b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧  p_1020) -> (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧ -b^{1, 1021}_0)
c  in CNF:
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_2
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_1
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_0
c  in DIMACS:
-4220  4221 -4222 -1020 -4223 0
-4220  4221 -4222 -1020 -4224 0
-4220  4221 -4222 -1020 -4225 0

c  0+1 --> 1
c    (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧  p_1020) -> (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0)
c  in CNF:
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_2
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_1
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨  b^{1, 1021}_0
c  in DIMACS:
 4220  4221  4222 -1020 -4223 0
 4220  4221  4222 -1020 -4224 0
 4220  4221  4222 -1020  4225 0

c  1+1 --> 2
c    (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧  p_1020) -> (-b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0)
c  in CNF:
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_2
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨  b^{1, 1021}_1
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ -p_1020 ∨ -b^{1, 1021}_0
c  in DIMACS:
 4220  4221 -4222 -1020 -4223 0
 4220  4221 -4222 -1020  4224 0
 4220  4221 -4222 -1020 -4225 0

c  2+1 --> break 
c    (-b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 4220 -4221  4222 -1020 1162 0


c  2-1 --> 1
c    (-b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧ -p_1020) -> (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0)
c  in CNF:
c     b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_2
c     b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_1
c     b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨  b^{1, 1021}_0
c  in DIMACS:
 4220 -4221  4222  1020 -4223 0
 4220 -4221  4222  1020 -4224 0
 4220 -4221  4222  1020  4225 0

c  1-1 --> 0
c    (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧ -p_1020) -> (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧ -b^{1, 1021}_0)
c  in CNF:
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_2
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_1
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_0
c  in DIMACS:
 4220  4221 -4222  1020 -4223 0
 4220  4221 -4222  1020 -4224 0
 4220  4221 -4222  1020 -4225 0

c  0-1 --> -1
c    (-b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧ -p_1020) -> ( b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0)
c  in CNF:
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨  b^{1, 1021}_2
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_1
c     b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨  b^{1, 1021}_0
c  in DIMACS:
 4220  4221  4222  1020  4223 0
 4220  4221  4222  1020 -4224 0
 4220  4221  4222  1020  4225 0

c  -1-1 --> -2
c    ( b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧ -p_1020) -> ( b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0)
c  in CNF:
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨  b^{1, 1021}_2
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨  b^{1, 1021}_1
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨  p_1020 ∨ -b^{1, 1021}_0
c  in DIMACS:
-4220  4221 -4222  1020  4223 0
-4220  4221 -4222  1020  4224 0
-4220  4221 -4222  1020 -4225 0

c  -2-1 --> break 
c    ( b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-4220 -4221  4222  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1020}_2 ∧ -b^{1, 1020}_1 ∧ -b^{1, 1020}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1020}_2 ∨  b^{1, 1020}_1 ∨  b^{1, 1020}_0 ∨ false 
c  in DIMACS:
-4220  4221  4222  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧ true) 
c  in CNF:
c     b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ false 
c  in DIMACS:
 4220 -4221 -4222  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1020}_2 ∧  b^{1, 1020}_1 ∧  b^{1, 1020}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1020}_2 ∨ -b^{1, 1020}_1 ∨ -b^{1, 1020}_0 ∨ false 
c  in DIMACS:
-4220 -4221 -4222  0

c i = 1021
c  -2+1 --> -1
c    ( b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧  p_1021) -> ( b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0)
c  in CNF:
c    -b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨  b^{1, 1022}_2
c    -b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_1
c    -b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨  b^{1, 1022}_0
c  in DIMACS:
-4223 -4224  4225 -1021  4226 0
-4223 -4224  4225 -1021 -4227 0
-4223 -4224  4225 -1021  4228 0

c  -1+1 --> 0
c    ( b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧  p_1021) -> (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧ -b^{1, 1022}_0)
c  in CNF:
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_2
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_1
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_0
c  in DIMACS:
-4223  4224 -4225 -1021 -4226 0
-4223  4224 -4225 -1021 -4227 0
-4223  4224 -4225 -1021 -4228 0

c  0+1 --> 1
c    (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧  p_1021) -> (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0)
c  in CNF:
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_2
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_1
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨  b^{1, 1022}_0
c  in DIMACS:
 4223  4224  4225 -1021 -4226 0
 4223  4224  4225 -1021 -4227 0
 4223  4224  4225 -1021  4228 0

c  1+1 --> 2
c    (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧  p_1021) -> (-b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0)
c  in CNF:
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_2
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨  b^{1, 1022}_1
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ -p_1021 ∨ -b^{1, 1022}_0
c  in DIMACS:
 4223  4224 -4225 -1021 -4226 0
 4223  4224 -4225 -1021  4227 0
 4223  4224 -4225 -1021 -4228 0

c  2+1 --> break 
c    (-b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧  p_1021) -> break
c  in CNF:
c     b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ -p_1021 ∨ break
c  in DIMACS:
 4223 -4224  4225 -1021 1162 0


c  2-1 --> 1
c    (-b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧ -p_1021) -> (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0)
c  in CNF:
c     b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_2
c     b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_1
c     b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨  b^{1, 1022}_0
c  in DIMACS:
 4223 -4224  4225  1021 -4226 0
 4223 -4224  4225  1021 -4227 0
 4223 -4224  4225  1021  4228 0

c  1-1 --> 0
c    (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧ -p_1021) -> (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧ -b^{1, 1022}_0)
c  in CNF:
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_2
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_1
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_0
c  in DIMACS:
 4223  4224 -4225  1021 -4226 0
 4223  4224 -4225  1021 -4227 0
 4223  4224 -4225  1021 -4228 0

c  0-1 --> -1
c    (-b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧ -p_1021) -> ( b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0)
c  in CNF:
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨  b^{1, 1022}_2
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_1
c     b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨  b^{1, 1022}_0
c  in DIMACS:
 4223  4224  4225  1021  4226 0
 4223  4224  4225  1021 -4227 0
 4223  4224  4225  1021  4228 0

c  -1-1 --> -2
c    ( b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧ -p_1021) -> ( b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0)
c  in CNF:
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨  b^{1, 1022}_2
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨  b^{1, 1022}_1
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨  p_1021 ∨ -b^{1, 1022}_0
c  in DIMACS:
-4223  4224 -4225  1021  4226 0
-4223  4224 -4225  1021  4227 0
-4223  4224 -4225  1021 -4228 0

c  -2-1 --> break 
c    ( b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧ -p_1021) -> break
c  in CNF:
c    -b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨  p_1021 ∨ break
c  in DIMACS:
-4223 -4224  4225  1021 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1021}_2 ∧ -b^{1, 1021}_1 ∧ -b^{1, 1021}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1021}_2 ∨  b^{1, 1021}_1 ∨  b^{1, 1021}_0 ∨ false 
c  in DIMACS:
-4223  4224  4225  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧ true) 
c  in CNF:
c     b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ false 
c  in DIMACS:
 4223 -4224 -4225  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1021}_2 ∧  b^{1, 1021}_1 ∧  b^{1, 1021}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1021}_2 ∨ -b^{1, 1021}_1 ∨ -b^{1, 1021}_0 ∨ false 
c  in DIMACS:
-4223 -4224 -4225  0

c i = 1022
c  -2+1 --> -1
c    ( b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧  p_1022) -> ( b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0)
c  in CNF:
c    -b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨  b^{1, 1023}_2
c    -b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_1
c    -b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨  b^{1, 1023}_0
c  in DIMACS:
-4226 -4227  4228 -1022  4229 0
-4226 -4227  4228 -1022 -4230 0
-4226 -4227  4228 -1022  4231 0

c  -1+1 --> 0
c    ( b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧  p_1022) -> (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧ -b^{1, 1023}_0)
c  in CNF:
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_2
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_1
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_0
c  in DIMACS:
-4226  4227 -4228 -1022 -4229 0
-4226  4227 -4228 -1022 -4230 0
-4226  4227 -4228 -1022 -4231 0

c  0+1 --> 1
c    (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧  p_1022) -> (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0)
c  in CNF:
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_2
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_1
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨  b^{1, 1023}_0
c  in DIMACS:
 4226  4227  4228 -1022 -4229 0
 4226  4227  4228 -1022 -4230 0
 4226  4227  4228 -1022  4231 0

c  1+1 --> 2
c    (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧  p_1022) -> (-b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0)
c  in CNF:
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_2
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨  b^{1, 1023}_1
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ -p_1022 ∨ -b^{1, 1023}_0
c  in DIMACS:
 4226  4227 -4228 -1022 -4229 0
 4226  4227 -4228 -1022  4230 0
 4226  4227 -4228 -1022 -4231 0

c  2+1 --> break 
c    (-b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 4226 -4227  4228 -1022 1162 0


c  2-1 --> 1
c    (-b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧ -p_1022) -> (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0)
c  in CNF:
c     b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_2
c     b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_1
c     b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨  b^{1, 1023}_0
c  in DIMACS:
 4226 -4227  4228  1022 -4229 0
 4226 -4227  4228  1022 -4230 0
 4226 -4227  4228  1022  4231 0

c  1-1 --> 0
c    (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧ -p_1022) -> (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧ -b^{1, 1023}_0)
c  in CNF:
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_2
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_1
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_0
c  in DIMACS:
 4226  4227 -4228  1022 -4229 0
 4226  4227 -4228  1022 -4230 0
 4226  4227 -4228  1022 -4231 0

c  0-1 --> -1
c    (-b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧ -p_1022) -> ( b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0)
c  in CNF:
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨  b^{1, 1023}_2
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_1
c     b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨  b^{1, 1023}_0
c  in DIMACS:
 4226  4227  4228  1022  4229 0
 4226  4227  4228  1022 -4230 0
 4226  4227  4228  1022  4231 0

c  -1-1 --> -2
c    ( b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧ -p_1022) -> ( b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0)
c  in CNF:
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨  b^{1, 1023}_2
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨  b^{1, 1023}_1
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨  p_1022 ∨ -b^{1, 1023}_0
c  in DIMACS:
-4226  4227 -4228  1022  4229 0
-4226  4227 -4228  1022  4230 0
-4226  4227 -4228  1022 -4231 0

c  -2-1 --> break 
c    ( b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-4226 -4227  4228  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1022}_2 ∧ -b^{1, 1022}_1 ∧ -b^{1, 1022}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1022}_2 ∨  b^{1, 1022}_1 ∨  b^{1, 1022}_0 ∨ false 
c  in DIMACS:
-4226  4227  4228  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧ true) 
c  in CNF:
c     b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ false 
c  in DIMACS:
 4226 -4227 -4228  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1022}_2 ∧  b^{1, 1022}_1 ∧  b^{1, 1022}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1022}_2 ∨ -b^{1, 1022}_1 ∨ -b^{1, 1022}_0 ∨ false 
c  in DIMACS:
-4226 -4227 -4228  0

c i = 1023
c  -2+1 --> -1
c    ( b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧  p_1023) -> ( b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0)
c  in CNF:
c    -b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨  b^{1, 1024}_2
c    -b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_1
c    -b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨  b^{1, 1024}_0
c  in DIMACS:
-4229 -4230  4231 -1023  4232 0
-4229 -4230  4231 -1023 -4233 0
-4229 -4230  4231 -1023  4234 0

c  -1+1 --> 0
c    ( b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧  p_1023) -> (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧ -b^{1, 1024}_0)
c  in CNF:
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_2
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_1
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_0
c  in DIMACS:
-4229  4230 -4231 -1023 -4232 0
-4229  4230 -4231 -1023 -4233 0
-4229  4230 -4231 -1023 -4234 0

c  0+1 --> 1
c    (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧  p_1023) -> (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0)
c  in CNF:
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_2
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_1
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨  b^{1, 1024}_0
c  in DIMACS:
 4229  4230  4231 -1023 -4232 0
 4229  4230  4231 -1023 -4233 0
 4229  4230  4231 -1023  4234 0

c  1+1 --> 2
c    (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧  p_1023) -> (-b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0)
c  in CNF:
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_2
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨  b^{1, 1024}_1
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ -p_1023 ∨ -b^{1, 1024}_0
c  in DIMACS:
 4229  4230 -4231 -1023 -4232 0
 4229  4230 -4231 -1023  4233 0
 4229  4230 -4231 -1023 -4234 0

c  2+1 --> break 
c    (-b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 4229 -4230  4231 -1023 1162 0


c  2-1 --> 1
c    (-b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧ -p_1023) -> (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0)
c  in CNF:
c     b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_2
c     b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_1
c     b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨  b^{1, 1024}_0
c  in DIMACS:
 4229 -4230  4231  1023 -4232 0
 4229 -4230  4231  1023 -4233 0
 4229 -4230  4231  1023  4234 0

c  1-1 --> 0
c    (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧ -p_1023) -> (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧ -b^{1, 1024}_0)
c  in CNF:
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_2
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_1
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_0
c  in DIMACS:
 4229  4230 -4231  1023 -4232 0
 4229  4230 -4231  1023 -4233 0
 4229  4230 -4231  1023 -4234 0

c  0-1 --> -1
c    (-b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧ -p_1023) -> ( b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0)
c  in CNF:
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨  b^{1, 1024}_2
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_1
c     b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨  b^{1, 1024}_0
c  in DIMACS:
 4229  4230  4231  1023  4232 0
 4229  4230  4231  1023 -4233 0
 4229  4230  4231  1023  4234 0

c  -1-1 --> -2
c    ( b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧ -p_1023) -> ( b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0)
c  in CNF:
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨  b^{1, 1024}_2
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨  b^{1, 1024}_1
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨  p_1023 ∨ -b^{1, 1024}_0
c  in DIMACS:
-4229  4230 -4231  1023  4232 0
-4229  4230 -4231  1023  4233 0
-4229  4230 -4231  1023 -4234 0

c  -2-1 --> break 
c    ( b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-4229 -4230  4231  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1023}_2 ∧ -b^{1, 1023}_1 ∧ -b^{1, 1023}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1023}_2 ∨  b^{1, 1023}_1 ∨  b^{1, 1023}_0 ∨ false 
c  in DIMACS:
-4229  4230  4231  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧ true) 
c  in CNF:
c     b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ false 
c  in DIMACS:
 4229 -4230 -4231  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1023}_2 ∧  b^{1, 1023}_1 ∧  b^{1, 1023}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1023}_2 ∨ -b^{1, 1023}_1 ∨ -b^{1, 1023}_0 ∨ false 
c  in DIMACS:
-4229 -4230 -4231  0

c i = 1024
c  -2+1 --> -1
c    ( b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧  p_1024) -> ( b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0)
c  in CNF:
c    -b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨  b^{1, 1025}_2
c    -b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_1
c    -b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨  b^{1, 1025}_0
c  in DIMACS:
-4232 -4233  4234 -1024  4235 0
-4232 -4233  4234 -1024 -4236 0
-4232 -4233  4234 -1024  4237 0

c  -1+1 --> 0
c    ( b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧  p_1024) -> (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧ -b^{1, 1025}_0)
c  in CNF:
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_2
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_1
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_0
c  in DIMACS:
-4232  4233 -4234 -1024 -4235 0
-4232  4233 -4234 -1024 -4236 0
-4232  4233 -4234 -1024 -4237 0

c  0+1 --> 1
c    (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧  p_1024) -> (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0)
c  in CNF:
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_2
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_1
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨  b^{1, 1025}_0
c  in DIMACS:
 4232  4233  4234 -1024 -4235 0
 4232  4233  4234 -1024 -4236 0
 4232  4233  4234 -1024  4237 0

c  1+1 --> 2
c    (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧  p_1024) -> (-b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0)
c  in CNF:
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_2
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨  b^{1, 1025}_1
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ -p_1024 ∨ -b^{1, 1025}_0
c  in DIMACS:
 4232  4233 -4234 -1024 -4235 0
 4232  4233 -4234 -1024  4236 0
 4232  4233 -4234 -1024 -4237 0

c  2+1 --> break 
c    (-b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 4232 -4233  4234 -1024 1162 0


c  2-1 --> 1
c    (-b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧ -p_1024) -> (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0)
c  in CNF:
c     b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_2
c     b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_1
c     b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨  b^{1, 1025}_0
c  in DIMACS:
 4232 -4233  4234  1024 -4235 0
 4232 -4233  4234  1024 -4236 0
 4232 -4233  4234  1024  4237 0

c  1-1 --> 0
c    (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧ -p_1024) -> (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧ -b^{1, 1025}_0)
c  in CNF:
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_2
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_1
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_0
c  in DIMACS:
 4232  4233 -4234  1024 -4235 0
 4232  4233 -4234  1024 -4236 0
 4232  4233 -4234  1024 -4237 0

c  0-1 --> -1
c    (-b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧ -p_1024) -> ( b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0)
c  in CNF:
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨  b^{1, 1025}_2
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_1
c     b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨  b^{1, 1025}_0
c  in DIMACS:
 4232  4233  4234  1024  4235 0
 4232  4233  4234  1024 -4236 0
 4232  4233  4234  1024  4237 0

c  -1-1 --> -2
c    ( b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧ -p_1024) -> ( b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0)
c  in CNF:
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨  b^{1, 1025}_2
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨  b^{1, 1025}_1
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨  p_1024 ∨ -b^{1, 1025}_0
c  in DIMACS:
-4232  4233 -4234  1024  4235 0
-4232  4233 -4234  1024  4236 0
-4232  4233 -4234  1024 -4237 0

c  -2-1 --> break 
c    ( b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-4232 -4233  4234  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1024}_2 ∧ -b^{1, 1024}_1 ∧ -b^{1, 1024}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1024}_2 ∨  b^{1, 1024}_1 ∨  b^{1, 1024}_0 ∨ false 
c  in DIMACS:
-4232  4233  4234  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧ true) 
c  in CNF:
c     b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ false 
c  in DIMACS:
 4232 -4233 -4234  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1024}_2 ∧  b^{1, 1024}_1 ∧  b^{1, 1024}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1024}_2 ∨ -b^{1, 1024}_1 ∨ -b^{1, 1024}_0 ∨ false 
c  in DIMACS:
-4232 -4233 -4234  0

c i = 1025
c  -2+1 --> -1
c    ( b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧  p_1025) -> ( b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0)
c  in CNF:
c    -b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨  b^{1, 1026}_2
c    -b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_1
c    -b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨  b^{1, 1026}_0
c  in DIMACS:
-4235 -4236  4237 -1025  4238 0
-4235 -4236  4237 -1025 -4239 0
-4235 -4236  4237 -1025  4240 0

c  -1+1 --> 0
c    ( b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧  p_1025) -> (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧ -b^{1, 1026}_0)
c  in CNF:
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_2
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_1
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_0
c  in DIMACS:
-4235  4236 -4237 -1025 -4238 0
-4235  4236 -4237 -1025 -4239 0
-4235  4236 -4237 -1025 -4240 0

c  0+1 --> 1
c    (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧  p_1025) -> (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0)
c  in CNF:
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_2
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_1
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨  b^{1, 1026}_0
c  in DIMACS:
 4235  4236  4237 -1025 -4238 0
 4235  4236  4237 -1025 -4239 0
 4235  4236  4237 -1025  4240 0

c  1+1 --> 2
c    (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧  p_1025) -> (-b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0)
c  in CNF:
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_2
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨  b^{1, 1026}_1
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ -p_1025 ∨ -b^{1, 1026}_0
c  in DIMACS:
 4235  4236 -4237 -1025 -4238 0
 4235  4236 -4237 -1025  4239 0
 4235  4236 -4237 -1025 -4240 0

c  2+1 --> break 
c    (-b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧  p_1025) -> break
c  in CNF:
c     b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ -p_1025 ∨ break
c  in DIMACS:
 4235 -4236  4237 -1025 1162 0


c  2-1 --> 1
c    (-b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧ -p_1025) -> (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0)
c  in CNF:
c     b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_2
c     b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_1
c     b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨  b^{1, 1026}_0
c  in DIMACS:
 4235 -4236  4237  1025 -4238 0
 4235 -4236  4237  1025 -4239 0
 4235 -4236  4237  1025  4240 0

c  1-1 --> 0
c    (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧ -p_1025) -> (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧ -b^{1, 1026}_0)
c  in CNF:
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_2
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_1
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_0
c  in DIMACS:
 4235  4236 -4237  1025 -4238 0
 4235  4236 -4237  1025 -4239 0
 4235  4236 -4237  1025 -4240 0

c  0-1 --> -1
c    (-b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧ -p_1025) -> ( b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0)
c  in CNF:
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨  b^{1, 1026}_2
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_1
c     b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨  b^{1, 1026}_0
c  in DIMACS:
 4235  4236  4237  1025  4238 0
 4235  4236  4237  1025 -4239 0
 4235  4236  4237  1025  4240 0

c  -1-1 --> -2
c    ( b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧ -p_1025) -> ( b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0)
c  in CNF:
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨  b^{1, 1026}_2
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨  b^{1, 1026}_1
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨  p_1025 ∨ -b^{1, 1026}_0
c  in DIMACS:
-4235  4236 -4237  1025  4238 0
-4235  4236 -4237  1025  4239 0
-4235  4236 -4237  1025 -4240 0

c  -2-1 --> break 
c    ( b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧ -p_1025) -> break
c  in CNF:
c    -b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨  p_1025 ∨ break
c  in DIMACS:
-4235 -4236  4237  1025 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1025}_2 ∧ -b^{1, 1025}_1 ∧ -b^{1, 1025}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1025}_2 ∨  b^{1, 1025}_1 ∨  b^{1, 1025}_0 ∨ false 
c  in DIMACS:
-4235  4236  4237  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧ true) 
c  in CNF:
c     b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ false 
c  in DIMACS:
 4235 -4236 -4237  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1025}_2 ∧  b^{1, 1025}_1 ∧  b^{1, 1025}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1025}_2 ∨ -b^{1, 1025}_1 ∨ -b^{1, 1025}_0 ∨ false 
c  in DIMACS:
-4235 -4236 -4237  0

c i = 1026
c  -2+1 --> -1
c    ( b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧  p_1026) -> ( b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0)
c  in CNF:
c    -b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨  b^{1, 1027}_2
c    -b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_1
c    -b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨  b^{1, 1027}_0
c  in DIMACS:
-4238 -4239  4240 -1026  4241 0
-4238 -4239  4240 -1026 -4242 0
-4238 -4239  4240 -1026  4243 0

c  -1+1 --> 0
c    ( b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧  p_1026) -> (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧ -b^{1, 1027}_0)
c  in CNF:
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_2
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_1
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_0
c  in DIMACS:
-4238  4239 -4240 -1026 -4241 0
-4238  4239 -4240 -1026 -4242 0
-4238  4239 -4240 -1026 -4243 0

c  0+1 --> 1
c    (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧  p_1026) -> (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0)
c  in CNF:
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_2
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_1
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨  b^{1, 1027}_0
c  in DIMACS:
 4238  4239  4240 -1026 -4241 0
 4238  4239  4240 -1026 -4242 0
 4238  4239  4240 -1026  4243 0

c  1+1 --> 2
c    (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧  p_1026) -> (-b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0)
c  in CNF:
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_2
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨  b^{1, 1027}_1
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ -p_1026 ∨ -b^{1, 1027}_0
c  in DIMACS:
 4238  4239 -4240 -1026 -4241 0
 4238  4239 -4240 -1026  4242 0
 4238  4239 -4240 -1026 -4243 0

c  2+1 --> break 
c    (-b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 4238 -4239  4240 -1026 1162 0


c  2-1 --> 1
c    (-b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧ -p_1026) -> (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0)
c  in CNF:
c     b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_2
c     b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_1
c     b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨  b^{1, 1027}_0
c  in DIMACS:
 4238 -4239  4240  1026 -4241 0
 4238 -4239  4240  1026 -4242 0
 4238 -4239  4240  1026  4243 0

c  1-1 --> 0
c    (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧ -p_1026) -> (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧ -b^{1, 1027}_0)
c  in CNF:
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_2
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_1
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_0
c  in DIMACS:
 4238  4239 -4240  1026 -4241 0
 4238  4239 -4240  1026 -4242 0
 4238  4239 -4240  1026 -4243 0

c  0-1 --> -1
c    (-b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧ -p_1026) -> ( b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0)
c  in CNF:
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨  b^{1, 1027}_2
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_1
c     b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨  b^{1, 1027}_0
c  in DIMACS:
 4238  4239  4240  1026  4241 0
 4238  4239  4240  1026 -4242 0
 4238  4239  4240  1026  4243 0

c  -1-1 --> -2
c    ( b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧ -p_1026) -> ( b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0)
c  in CNF:
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨  b^{1, 1027}_2
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨  b^{1, 1027}_1
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨  p_1026 ∨ -b^{1, 1027}_0
c  in DIMACS:
-4238  4239 -4240  1026  4241 0
-4238  4239 -4240  1026  4242 0
-4238  4239 -4240  1026 -4243 0

c  -2-1 --> break 
c    ( b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-4238 -4239  4240  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1026}_2 ∧ -b^{1, 1026}_1 ∧ -b^{1, 1026}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1026}_2 ∨  b^{1, 1026}_1 ∨  b^{1, 1026}_0 ∨ false 
c  in DIMACS:
-4238  4239  4240  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧ true) 
c  in CNF:
c     b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ false 
c  in DIMACS:
 4238 -4239 -4240  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1026}_2 ∧  b^{1, 1026}_1 ∧  b^{1, 1026}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1026}_2 ∨ -b^{1, 1026}_1 ∨ -b^{1, 1026}_0 ∨ false 
c  in DIMACS:
-4238 -4239 -4240  0

c i = 1027
c  -2+1 --> -1
c    ( b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧  p_1027) -> ( b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0)
c  in CNF:
c    -b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨  b^{1, 1028}_2
c    -b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_1
c    -b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨  b^{1, 1028}_0
c  in DIMACS:
-4241 -4242  4243 -1027  4244 0
-4241 -4242  4243 -1027 -4245 0
-4241 -4242  4243 -1027  4246 0

c  -1+1 --> 0
c    ( b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧  p_1027) -> (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧ -b^{1, 1028}_0)
c  in CNF:
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_2
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_1
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_0
c  in DIMACS:
-4241  4242 -4243 -1027 -4244 0
-4241  4242 -4243 -1027 -4245 0
-4241  4242 -4243 -1027 -4246 0

c  0+1 --> 1
c    (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧  p_1027) -> (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0)
c  in CNF:
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_2
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_1
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨  b^{1, 1028}_0
c  in DIMACS:
 4241  4242  4243 -1027 -4244 0
 4241  4242  4243 -1027 -4245 0
 4241  4242  4243 -1027  4246 0

c  1+1 --> 2
c    (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧  p_1027) -> (-b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0)
c  in CNF:
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_2
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨  b^{1, 1028}_1
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ -p_1027 ∨ -b^{1, 1028}_0
c  in DIMACS:
 4241  4242 -4243 -1027 -4244 0
 4241  4242 -4243 -1027  4245 0
 4241  4242 -4243 -1027 -4246 0

c  2+1 --> break 
c    (-b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧  p_1027) -> break
c  in CNF:
c     b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ -p_1027 ∨ break
c  in DIMACS:
 4241 -4242  4243 -1027 1162 0


c  2-1 --> 1
c    (-b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧ -p_1027) -> (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0)
c  in CNF:
c     b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_2
c     b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_1
c     b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨  b^{1, 1028}_0
c  in DIMACS:
 4241 -4242  4243  1027 -4244 0
 4241 -4242  4243  1027 -4245 0
 4241 -4242  4243  1027  4246 0

c  1-1 --> 0
c    (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧ -p_1027) -> (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧ -b^{1, 1028}_0)
c  in CNF:
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_2
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_1
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_0
c  in DIMACS:
 4241  4242 -4243  1027 -4244 0
 4241  4242 -4243  1027 -4245 0
 4241  4242 -4243  1027 -4246 0

c  0-1 --> -1
c    (-b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧ -p_1027) -> ( b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0)
c  in CNF:
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨  b^{1, 1028}_2
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_1
c     b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨  b^{1, 1028}_0
c  in DIMACS:
 4241  4242  4243  1027  4244 0
 4241  4242  4243  1027 -4245 0
 4241  4242  4243  1027  4246 0

c  -1-1 --> -2
c    ( b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧ -p_1027) -> ( b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0)
c  in CNF:
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨  b^{1, 1028}_2
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨  b^{1, 1028}_1
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨  p_1027 ∨ -b^{1, 1028}_0
c  in DIMACS:
-4241  4242 -4243  1027  4244 0
-4241  4242 -4243  1027  4245 0
-4241  4242 -4243  1027 -4246 0

c  -2-1 --> break 
c    ( b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧ -p_1027) -> break
c  in CNF:
c    -b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨  p_1027 ∨ break
c  in DIMACS:
-4241 -4242  4243  1027 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1027}_2 ∧ -b^{1, 1027}_1 ∧ -b^{1, 1027}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1027}_2 ∨  b^{1, 1027}_1 ∨  b^{1, 1027}_0 ∨ false 
c  in DIMACS:
-4241  4242  4243  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧ true) 
c  in CNF:
c     b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ false 
c  in DIMACS:
 4241 -4242 -4243  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1027}_2 ∧  b^{1, 1027}_1 ∧  b^{1, 1027}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1027}_2 ∨ -b^{1, 1027}_1 ∨ -b^{1, 1027}_0 ∨ false 
c  in DIMACS:
-4241 -4242 -4243  0

c i = 1028
c  -2+1 --> -1
c    ( b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧  p_1028) -> ( b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0)
c  in CNF:
c    -b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨  b^{1, 1029}_2
c    -b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_1
c    -b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨  b^{1, 1029}_0
c  in DIMACS:
-4244 -4245  4246 -1028  4247 0
-4244 -4245  4246 -1028 -4248 0
-4244 -4245  4246 -1028  4249 0

c  -1+1 --> 0
c    ( b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧  p_1028) -> (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧ -b^{1, 1029}_0)
c  in CNF:
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_2
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_1
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_0
c  in DIMACS:
-4244  4245 -4246 -1028 -4247 0
-4244  4245 -4246 -1028 -4248 0
-4244  4245 -4246 -1028 -4249 0

c  0+1 --> 1
c    (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧  p_1028) -> (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0)
c  in CNF:
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_2
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_1
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨  b^{1, 1029}_0
c  in DIMACS:
 4244  4245  4246 -1028 -4247 0
 4244  4245  4246 -1028 -4248 0
 4244  4245  4246 -1028  4249 0

c  1+1 --> 2
c    (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧  p_1028) -> (-b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0)
c  in CNF:
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_2
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨  b^{1, 1029}_1
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ -p_1028 ∨ -b^{1, 1029}_0
c  in DIMACS:
 4244  4245 -4246 -1028 -4247 0
 4244  4245 -4246 -1028  4248 0
 4244  4245 -4246 -1028 -4249 0

c  2+1 --> break 
c    (-b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧  p_1028) -> break
c  in CNF:
c     b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ -p_1028 ∨ break
c  in DIMACS:
 4244 -4245  4246 -1028 1162 0


c  2-1 --> 1
c    (-b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧ -p_1028) -> (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0)
c  in CNF:
c     b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_2
c     b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_1
c     b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨  b^{1, 1029}_0
c  in DIMACS:
 4244 -4245  4246  1028 -4247 0
 4244 -4245  4246  1028 -4248 0
 4244 -4245  4246  1028  4249 0

c  1-1 --> 0
c    (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧ -p_1028) -> (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧ -b^{1, 1029}_0)
c  in CNF:
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_2
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_1
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_0
c  in DIMACS:
 4244  4245 -4246  1028 -4247 0
 4244  4245 -4246  1028 -4248 0
 4244  4245 -4246  1028 -4249 0

c  0-1 --> -1
c    (-b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧ -p_1028) -> ( b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0)
c  in CNF:
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨  b^{1, 1029}_2
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_1
c     b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨  b^{1, 1029}_0
c  in DIMACS:
 4244  4245  4246  1028  4247 0
 4244  4245  4246  1028 -4248 0
 4244  4245  4246  1028  4249 0

c  -1-1 --> -2
c    ( b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧ -p_1028) -> ( b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0)
c  in CNF:
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨  b^{1, 1029}_2
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨  b^{1, 1029}_1
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨  p_1028 ∨ -b^{1, 1029}_0
c  in DIMACS:
-4244  4245 -4246  1028  4247 0
-4244  4245 -4246  1028  4248 0
-4244  4245 -4246  1028 -4249 0

c  -2-1 --> break 
c    ( b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧ -p_1028) -> break
c  in CNF:
c    -b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨  p_1028 ∨ break
c  in DIMACS:
-4244 -4245  4246  1028 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1028}_2 ∧ -b^{1, 1028}_1 ∧ -b^{1, 1028}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1028}_2 ∨  b^{1, 1028}_1 ∨  b^{1, 1028}_0 ∨ false 
c  in DIMACS:
-4244  4245  4246  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧ true) 
c  in CNF:
c     b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ false 
c  in DIMACS:
 4244 -4245 -4246  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1028}_2 ∧  b^{1, 1028}_1 ∧  b^{1, 1028}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1028}_2 ∨ -b^{1, 1028}_1 ∨ -b^{1, 1028}_0 ∨ false 
c  in DIMACS:
-4244 -4245 -4246  0

c i = 1029
c  -2+1 --> -1
c    ( b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧  p_1029) -> ( b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0)
c  in CNF:
c    -b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨  b^{1, 1030}_2
c    -b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_1
c    -b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨  b^{1, 1030}_0
c  in DIMACS:
-4247 -4248  4249 -1029  4250 0
-4247 -4248  4249 -1029 -4251 0
-4247 -4248  4249 -1029  4252 0

c  -1+1 --> 0
c    ( b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧  p_1029) -> (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧ -b^{1, 1030}_0)
c  in CNF:
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_2
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_1
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_0
c  in DIMACS:
-4247  4248 -4249 -1029 -4250 0
-4247  4248 -4249 -1029 -4251 0
-4247  4248 -4249 -1029 -4252 0

c  0+1 --> 1
c    (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧  p_1029) -> (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0)
c  in CNF:
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_2
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_1
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨  b^{1, 1030}_0
c  in DIMACS:
 4247  4248  4249 -1029 -4250 0
 4247  4248  4249 -1029 -4251 0
 4247  4248  4249 -1029  4252 0

c  1+1 --> 2
c    (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧  p_1029) -> (-b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0)
c  in CNF:
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_2
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨  b^{1, 1030}_1
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ -p_1029 ∨ -b^{1, 1030}_0
c  in DIMACS:
 4247  4248 -4249 -1029 -4250 0
 4247  4248 -4249 -1029  4251 0
 4247  4248 -4249 -1029 -4252 0

c  2+1 --> break 
c    (-b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 4247 -4248  4249 -1029 1162 0


c  2-1 --> 1
c    (-b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧ -p_1029) -> (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0)
c  in CNF:
c     b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_2
c     b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_1
c     b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨  b^{1, 1030}_0
c  in DIMACS:
 4247 -4248  4249  1029 -4250 0
 4247 -4248  4249  1029 -4251 0
 4247 -4248  4249  1029  4252 0

c  1-1 --> 0
c    (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧ -p_1029) -> (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧ -b^{1, 1030}_0)
c  in CNF:
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_2
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_1
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_0
c  in DIMACS:
 4247  4248 -4249  1029 -4250 0
 4247  4248 -4249  1029 -4251 0
 4247  4248 -4249  1029 -4252 0

c  0-1 --> -1
c    (-b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧ -p_1029) -> ( b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0)
c  in CNF:
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨  b^{1, 1030}_2
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_1
c     b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨  b^{1, 1030}_0
c  in DIMACS:
 4247  4248  4249  1029  4250 0
 4247  4248  4249  1029 -4251 0
 4247  4248  4249  1029  4252 0

c  -1-1 --> -2
c    ( b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧ -p_1029) -> ( b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0)
c  in CNF:
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨  b^{1, 1030}_2
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨  b^{1, 1030}_1
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨  p_1029 ∨ -b^{1, 1030}_0
c  in DIMACS:
-4247  4248 -4249  1029  4250 0
-4247  4248 -4249  1029  4251 0
-4247  4248 -4249  1029 -4252 0

c  -2-1 --> break 
c    ( b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-4247 -4248  4249  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1029}_2 ∧ -b^{1, 1029}_1 ∧ -b^{1, 1029}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1029}_2 ∨  b^{1, 1029}_1 ∨  b^{1, 1029}_0 ∨ false 
c  in DIMACS:
-4247  4248  4249  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧ true) 
c  in CNF:
c     b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ false 
c  in DIMACS:
 4247 -4248 -4249  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1029}_2 ∧  b^{1, 1029}_1 ∧  b^{1, 1029}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1029}_2 ∨ -b^{1, 1029}_1 ∨ -b^{1, 1029}_0 ∨ false 
c  in DIMACS:
-4247 -4248 -4249  0

c i = 1030
c  -2+1 --> -1
c    ( b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧  p_1030) -> ( b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0)
c  in CNF:
c    -b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨  b^{1, 1031}_2
c    -b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_1
c    -b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨  b^{1, 1031}_0
c  in DIMACS:
-4250 -4251  4252 -1030  4253 0
-4250 -4251  4252 -1030 -4254 0
-4250 -4251  4252 -1030  4255 0

c  -1+1 --> 0
c    ( b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧  p_1030) -> (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧ -b^{1, 1031}_0)
c  in CNF:
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_2
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_1
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_0
c  in DIMACS:
-4250  4251 -4252 -1030 -4253 0
-4250  4251 -4252 -1030 -4254 0
-4250  4251 -4252 -1030 -4255 0

c  0+1 --> 1
c    (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧  p_1030) -> (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0)
c  in CNF:
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_2
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_1
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨  b^{1, 1031}_0
c  in DIMACS:
 4250  4251  4252 -1030 -4253 0
 4250  4251  4252 -1030 -4254 0
 4250  4251  4252 -1030  4255 0

c  1+1 --> 2
c    (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧  p_1030) -> (-b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0)
c  in CNF:
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_2
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨  b^{1, 1031}_1
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ -p_1030 ∨ -b^{1, 1031}_0
c  in DIMACS:
 4250  4251 -4252 -1030 -4253 0
 4250  4251 -4252 -1030  4254 0
 4250  4251 -4252 -1030 -4255 0

c  2+1 --> break 
c    (-b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 4250 -4251  4252 -1030 1162 0


c  2-1 --> 1
c    (-b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧ -p_1030) -> (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0)
c  in CNF:
c     b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_2
c     b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_1
c     b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨  b^{1, 1031}_0
c  in DIMACS:
 4250 -4251  4252  1030 -4253 0
 4250 -4251  4252  1030 -4254 0
 4250 -4251  4252  1030  4255 0

c  1-1 --> 0
c    (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧ -p_1030) -> (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧ -b^{1, 1031}_0)
c  in CNF:
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_2
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_1
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_0
c  in DIMACS:
 4250  4251 -4252  1030 -4253 0
 4250  4251 -4252  1030 -4254 0
 4250  4251 -4252  1030 -4255 0

c  0-1 --> -1
c    (-b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧ -p_1030) -> ( b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0)
c  in CNF:
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨  b^{1, 1031}_2
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_1
c     b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨  b^{1, 1031}_0
c  in DIMACS:
 4250  4251  4252  1030  4253 0
 4250  4251  4252  1030 -4254 0
 4250  4251  4252  1030  4255 0

c  -1-1 --> -2
c    ( b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧ -p_1030) -> ( b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0)
c  in CNF:
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨  b^{1, 1031}_2
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨  b^{1, 1031}_1
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨  p_1030 ∨ -b^{1, 1031}_0
c  in DIMACS:
-4250  4251 -4252  1030  4253 0
-4250  4251 -4252  1030  4254 0
-4250  4251 -4252  1030 -4255 0

c  -2-1 --> break 
c    ( b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-4250 -4251  4252  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1030}_2 ∧ -b^{1, 1030}_1 ∧ -b^{1, 1030}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1030}_2 ∨  b^{1, 1030}_1 ∨  b^{1, 1030}_0 ∨ false 
c  in DIMACS:
-4250  4251  4252  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧ true) 
c  in CNF:
c     b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ false 
c  in DIMACS:
 4250 -4251 -4252  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1030}_2 ∧  b^{1, 1030}_1 ∧  b^{1, 1030}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1030}_2 ∨ -b^{1, 1030}_1 ∨ -b^{1, 1030}_0 ∨ false 
c  in DIMACS:
-4250 -4251 -4252  0

c i = 1031
c  -2+1 --> -1
c    ( b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧  p_1031) -> ( b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0)
c  in CNF:
c    -b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨  b^{1, 1032}_2
c    -b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_1
c    -b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨  b^{1, 1032}_0
c  in DIMACS:
-4253 -4254  4255 -1031  4256 0
-4253 -4254  4255 -1031 -4257 0
-4253 -4254  4255 -1031  4258 0

c  -1+1 --> 0
c    ( b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧  p_1031) -> (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧ -b^{1, 1032}_0)
c  in CNF:
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_2
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_1
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_0
c  in DIMACS:
-4253  4254 -4255 -1031 -4256 0
-4253  4254 -4255 -1031 -4257 0
-4253  4254 -4255 -1031 -4258 0

c  0+1 --> 1
c    (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧  p_1031) -> (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0)
c  in CNF:
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_2
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_1
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨  b^{1, 1032}_0
c  in DIMACS:
 4253  4254  4255 -1031 -4256 0
 4253  4254  4255 -1031 -4257 0
 4253  4254  4255 -1031  4258 0

c  1+1 --> 2
c    (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧  p_1031) -> (-b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0)
c  in CNF:
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_2
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨  b^{1, 1032}_1
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ -p_1031 ∨ -b^{1, 1032}_0
c  in DIMACS:
 4253  4254 -4255 -1031 -4256 0
 4253  4254 -4255 -1031  4257 0
 4253  4254 -4255 -1031 -4258 0

c  2+1 --> break 
c    (-b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧  p_1031) -> break
c  in CNF:
c     b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ -p_1031 ∨ break
c  in DIMACS:
 4253 -4254  4255 -1031 1162 0


c  2-1 --> 1
c    (-b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧ -p_1031) -> (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0)
c  in CNF:
c     b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_2
c     b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_1
c     b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨  b^{1, 1032}_0
c  in DIMACS:
 4253 -4254  4255  1031 -4256 0
 4253 -4254  4255  1031 -4257 0
 4253 -4254  4255  1031  4258 0

c  1-1 --> 0
c    (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧ -p_1031) -> (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧ -b^{1, 1032}_0)
c  in CNF:
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_2
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_1
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_0
c  in DIMACS:
 4253  4254 -4255  1031 -4256 0
 4253  4254 -4255  1031 -4257 0
 4253  4254 -4255  1031 -4258 0

c  0-1 --> -1
c    (-b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧ -p_1031) -> ( b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0)
c  in CNF:
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨  b^{1, 1032}_2
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_1
c     b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨  b^{1, 1032}_0
c  in DIMACS:
 4253  4254  4255  1031  4256 0
 4253  4254  4255  1031 -4257 0
 4253  4254  4255  1031  4258 0

c  -1-1 --> -2
c    ( b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧ -p_1031) -> ( b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0)
c  in CNF:
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨  b^{1, 1032}_2
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨  b^{1, 1032}_1
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨  p_1031 ∨ -b^{1, 1032}_0
c  in DIMACS:
-4253  4254 -4255  1031  4256 0
-4253  4254 -4255  1031  4257 0
-4253  4254 -4255  1031 -4258 0

c  -2-1 --> break 
c    ( b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧ -p_1031) -> break
c  in CNF:
c    -b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨  p_1031 ∨ break
c  in DIMACS:
-4253 -4254  4255  1031 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1031}_2 ∧ -b^{1, 1031}_1 ∧ -b^{1, 1031}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1031}_2 ∨  b^{1, 1031}_1 ∨  b^{1, 1031}_0 ∨ false 
c  in DIMACS:
-4253  4254  4255  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧ true) 
c  in CNF:
c     b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ false 
c  in DIMACS:
 4253 -4254 -4255  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1031}_2 ∧  b^{1, 1031}_1 ∧  b^{1, 1031}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1031}_2 ∨ -b^{1, 1031}_1 ∨ -b^{1, 1031}_0 ∨ false 
c  in DIMACS:
-4253 -4254 -4255  0

c i = 1032
c  -2+1 --> -1
c    ( b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧  p_1032) -> ( b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0)
c  in CNF:
c    -b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨  b^{1, 1033}_2
c    -b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_1
c    -b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨  b^{1, 1033}_0
c  in DIMACS:
-4256 -4257  4258 -1032  4259 0
-4256 -4257  4258 -1032 -4260 0
-4256 -4257  4258 -1032  4261 0

c  -1+1 --> 0
c    ( b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧  p_1032) -> (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧ -b^{1, 1033}_0)
c  in CNF:
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_2
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_1
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_0
c  in DIMACS:
-4256  4257 -4258 -1032 -4259 0
-4256  4257 -4258 -1032 -4260 0
-4256  4257 -4258 -1032 -4261 0

c  0+1 --> 1
c    (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧  p_1032) -> (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0)
c  in CNF:
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_2
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_1
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨  b^{1, 1033}_0
c  in DIMACS:
 4256  4257  4258 -1032 -4259 0
 4256  4257  4258 -1032 -4260 0
 4256  4257  4258 -1032  4261 0

c  1+1 --> 2
c    (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧  p_1032) -> (-b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0)
c  in CNF:
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_2
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨  b^{1, 1033}_1
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ -p_1032 ∨ -b^{1, 1033}_0
c  in DIMACS:
 4256  4257 -4258 -1032 -4259 0
 4256  4257 -4258 -1032  4260 0
 4256  4257 -4258 -1032 -4261 0

c  2+1 --> break 
c    (-b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 4256 -4257  4258 -1032 1162 0


c  2-1 --> 1
c    (-b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧ -p_1032) -> (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0)
c  in CNF:
c     b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_2
c     b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_1
c     b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨  b^{1, 1033}_0
c  in DIMACS:
 4256 -4257  4258  1032 -4259 0
 4256 -4257  4258  1032 -4260 0
 4256 -4257  4258  1032  4261 0

c  1-1 --> 0
c    (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧ -p_1032) -> (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧ -b^{1, 1033}_0)
c  in CNF:
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_2
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_1
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_0
c  in DIMACS:
 4256  4257 -4258  1032 -4259 0
 4256  4257 -4258  1032 -4260 0
 4256  4257 -4258  1032 -4261 0

c  0-1 --> -1
c    (-b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧ -p_1032) -> ( b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0)
c  in CNF:
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨  b^{1, 1033}_2
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_1
c     b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨  b^{1, 1033}_0
c  in DIMACS:
 4256  4257  4258  1032  4259 0
 4256  4257  4258  1032 -4260 0
 4256  4257  4258  1032  4261 0

c  -1-1 --> -2
c    ( b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧ -p_1032) -> ( b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0)
c  in CNF:
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨  b^{1, 1033}_2
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨  b^{1, 1033}_1
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨  p_1032 ∨ -b^{1, 1033}_0
c  in DIMACS:
-4256  4257 -4258  1032  4259 0
-4256  4257 -4258  1032  4260 0
-4256  4257 -4258  1032 -4261 0

c  -2-1 --> break 
c    ( b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-4256 -4257  4258  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1032}_2 ∧ -b^{1, 1032}_1 ∧ -b^{1, 1032}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1032}_2 ∨  b^{1, 1032}_1 ∨  b^{1, 1032}_0 ∨ false 
c  in DIMACS:
-4256  4257  4258  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧ true) 
c  in CNF:
c     b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ false 
c  in DIMACS:
 4256 -4257 -4258  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1032}_2 ∧  b^{1, 1032}_1 ∧  b^{1, 1032}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1032}_2 ∨ -b^{1, 1032}_1 ∨ -b^{1, 1032}_0 ∨ false 
c  in DIMACS:
-4256 -4257 -4258  0

c i = 1033
c  -2+1 --> -1
c    ( b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧  p_1033) -> ( b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0)
c  in CNF:
c    -b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨  b^{1, 1034}_2
c    -b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_1
c    -b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨  b^{1, 1034}_0
c  in DIMACS:
-4259 -4260  4261 -1033  4262 0
-4259 -4260  4261 -1033 -4263 0
-4259 -4260  4261 -1033  4264 0

c  -1+1 --> 0
c    ( b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧  p_1033) -> (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧ -b^{1, 1034}_0)
c  in CNF:
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_2
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_1
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_0
c  in DIMACS:
-4259  4260 -4261 -1033 -4262 0
-4259  4260 -4261 -1033 -4263 0
-4259  4260 -4261 -1033 -4264 0

c  0+1 --> 1
c    (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧  p_1033) -> (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0)
c  in CNF:
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_2
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_1
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨  b^{1, 1034}_0
c  in DIMACS:
 4259  4260  4261 -1033 -4262 0
 4259  4260  4261 -1033 -4263 0
 4259  4260  4261 -1033  4264 0

c  1+1 --> 2
c    (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧  p_1033) -> (-b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0)
c  in CNF:
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_2
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨  b^{1, 1034}_1
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ -p_1033 ∨ -b^{1, 1034}_0
c  in DIMACS:
 4259  4260 -4261 -1033 -4262 0
 4259  4260 -4261 -1033  4263 0
 4259  4260 -4261 -1033 -4264 0

c  2+1 --> break 
c    (-b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧  p_1033) -> break
c  in CNF:
c     b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ -p_1033 ∨ break
c  in DIMACS:
 4259 -4260  4261 -1033 1162 0


c  2-1 --> 1
c    (-b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧ -p_1033) -> (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0)
c  in CNF:
c     b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_2
c     b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_1
c     b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨  b^{1, 1034}_0
c  in DIMACS:
 4259 -4260  4261  1033 -4262 0
 4259 -4260  4261  1033 -4263 0
 4259 -4260  4261  1033  4264 0

c  1-1 --> 0
c    (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧ -p_1033) -> (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧ -b^{1, 1034}_0)
c  in CNF:
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_2
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_1
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_0
c  in DIMACS:
 4259  4260 -4261  1033 -4262 0
 4259  4260 -4261  1033 -4263 0
 4259  4260 -4261  1033 -4264 0

c  0-1 --> -1
c    (-b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧ -p_1033) -> ( b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0)
c  in CNF:
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨  b^{1, 1034}_2
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_1
c     b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨  b^{1, 1034}_0
c  in DIMACS:
 4259  4260  4261  1033  4262 0
 4259  4260  4261  1033 -4263 0
 4259  4260  4261  1033  4264 0

c  -1-1 --> -2
c    ( b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧ -p_1033) -> ( b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0)
c  in CNF:
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨  b^{1, 1034}_2
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨  b^{1, 1034}_1
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨  p_1033 ∨ -b^{1, 1034}_0
c  in DIMACS:
-4259  4260 -4261  1033  4262 0
-4259  4260 -4261  1033  4263 0
-4259  4260 -4261  1033 -4264 0

c  -2-1 --> break 
c    ( b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧ -p_1033) -> break
c  in CNF:
c    -b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨  p_1033 ∨ break
c  in DIMACS:
-4259 -4260  4261  1033 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1033}_2 ∧ -b^{1, 1033}_1 ∧ -b^{1, 1033}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1033}_2 ∨  b^{1, 1033}_1 ∨  b^{1, 1033}_0 ∨ false 
c  in DIMACS:
-4259  4260  4261  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧ true) 
c  in CNF:
c     b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ false 
c  in DIMACS:
 4259 -4260 -4261  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1033}_2 ∧  b^{1, 1033}_1 ∧  b^{1, 1033}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1033}_2 ∨ -b^{1, 1033}_1 ∨ -b^{1, 1033}_0 ∨ false 
c  in DIMACS:
-4259 -4260 -4261  0

c i = 1034
c  -2+1 --> -1
c    ( b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧  p_1034) -> ( b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0)
c  in CNF:
c    -b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨  b^{1, 1035}_2
c    -b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_1
c    -b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨  b^{1, 1035}_0
c  in DIMACS:
-4262 -4263  4264 -1034  4265 0
-4262 -4263  4264 -1034 -4266 0
-4262 -4263  4264 -1034  4267 0

c  -1+1 --> 0
c    ( b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧  p_1034) -> (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧ -b^{1, 1035}_0)
c  in CNF:
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_2
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_1
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_0
c  in DIMACS:
-4262  4263 -4264 -1034 -4265 0
-4262  4263 -4264 -1034 -4266 0
-4262  4263 -4264 -1034 -4267 0

c  0+1 --> 1
c    (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧  p_1034) -> (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0)
c  in CNF:
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_2
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_1
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨  b^{1, 1035}_0
c  in DIMACS:
 4262  4263  4264 -1034 -4265 0
 4262  4263  4264 -1034 -4266 0
 4262  4263  4264 -1034  4267 0

c  1+1 --> 2
c    (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧  p_1034) -> (-b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0)
c  in CNF:
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_2
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨  b^{1, 1035}_1
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ -p_1034 ∨ -b^{1, 1035}_0
c  in DIMACS:
 4262  4263 -4264 -1034 -4265 0
 4262  4263 -4264 -1034  4266 0
 4262  4263 -4264 -1034 -4267 0

c  2+1 --> break 
c    (-b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 4262 -4263  4264 -1034 1162 0


c  2-1 --> 1
c    (-b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧ -p_1034) -> (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0)
c  in CNF:
c     b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_2
c     b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_1
c     b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨  b^{1, 1035}_0
c  in DIMACS:
 4262 -4263  4264  1034 -4265 0
 4262 -4263  4264  1034 -4266 0
 4262 -4263  4264  1034  4267 0

c  1-1 --> 0
c    (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧ -p_1034) -> (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧ -b^{1, 1035}_0)
c  in CNF:
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_2
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_1
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_0
c  in DIMACS:
 4262  4263 -4264  1034 -4265 0
 4262  4263 -4264  1034 -4266 0
 4262  4263 -4264  1034 -4267 0

c  0-1 --> -1
c    (-b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧ -p_1034) -> ( b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0)
c  in CNF:
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨  b^{1, 1035}_2
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_1
c     b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨  b^{1, 1035}_0
c  in DIMACS:
 4262  4263  4264  1034  4265 0
 4262  4263  4264  1034 -4266 0
 4262  4263  4264  1034  4267 0

c  -1-1 --> -2
c    ( b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧ -p_1034) -> ( b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0)
c  in CNF:
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨  b^{1, 1035}_2
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨  b^{1, 1035}_1
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨  p_1034 ∨ -b^{1, 1035}_0
c  in DIMACS:
-4262  4263 -4264  1034  4265 0
-4262  4263 -4264  1034  4266 0
-4262  4263 -4264  1034 -4267 0

c  -2-1 --> break 
c    ( b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-4262 -4263  4264  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1034}_2 ∧ -b^{1, 1034}_1 ∧ -b^{1, 1034}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1034}_2 ∨  b^{1, 1034}_1 ∨  b^{1, 1034}_0 ∨ false 
c  in DIMACS:
-4262  4263  4264  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧ true) 
c  in CNF:
c     b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ false 
c  in DIMACS:
 4262 -4263 -4264  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1034}_2 ∧  b^{1, 1034}_1 ∧  b^{1, 1034}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1034}_2 ∨ -b^{1, 1034}_1 ∨ -b^{1, 1034}_0 ∨ false 
c  in DIMACS:
-4262 -4263 -4264  0

c i = 1035
c  -2+1 --> -1
c    ( b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧  p_1035) -> ( b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0)
c  in CNF:
c    -b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨  b^{1, 1036}_2
c    -b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_1
c    -b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨  b^{1, 1036}_0
c  in DIMACS:
-4265 -4266  4267 -1035  4268 0
-4265 -4266  4267 -1035 -4269 0
-4265 -4266  4267 -1035  4270 0

c  -1+1 --> 0
c    ( b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧  p_1035) -> (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧ -b^{1, 1036}_0)
c  in CNF:
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_2
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_1
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_0
c  in DIMACS:
-4265  4266 -4267 -1035 -4268 0
-4265  4266 -4267 -1035 -4269 0
-4265  4266 -4267 -1035 -4270 0

c  0+1 --> 1
c    (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧  p_1035) -> (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0)
c  in CNF:
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_2
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_1
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨  b^{1, 1036}_0
c  in DIMACS:
 4265  4266  4267 -1035 -4268 0
 4265  4266  4267 -1035 -4269 0
 4265  4266  4267 -1035  4270 0

c  1+1 --> 2
c    (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧  p_1035) -> (-b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0)
c  in CNF:
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_2
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨  b^{1, 1036}_1
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ -p_1035 ∨ -b^{1, 1036}_0
c  in DIMACS:
 4265  4266 -4267 -1035 -4268 0
 4265  4266 -4267 -1035  4269 0
 4265  4266 -4267 -1035 -4270 0

c  2+1 --> break 
c    (-b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 4265 -4266  4267 -1035 1162 0


c  2-1 --> 1
c    (-b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧ -p_1035) -> (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0)
c  in CNF:
c     b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_2
c     b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_1
c     b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨  b^{1, 1036}_0
c  in DIMACS:
 4265 -4266  4267  1035 -4268 0
 4265 -4266  4267  1035 -4269 0
 4265 -4266  4267  1035  4270 0

c  1-1 --> 0
c    (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧ -p_1035) -> (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧ -b^{1, 1036}_0)
c  in CNF:
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_2
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_1
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_0
c  in DIMACS:
 4265  4266 -4267  1035 -4268 0
 4265  4266 -4267  1035 -4269 0
 4265  4266 -4267  1035 -4270 0

c  0-1 --> -1
c    (-b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧ -p_1035) -> ( b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0)
c  in CNF:
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨  b^{1, 1036}_2
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_1
c     b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨  b^{1, 1036}_0
c  in DIMACS:
 4265  4266  4267  1035  4268 0
 4265  4266  4267  1035 -4269 0
 4265  4266  4267  1035  4270 0

c  -1-1 --> -2
c    ( b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧ -p_1035) -> ( b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0)
c  in CNF:
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨  b^{1, 1036}_2
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨  b^{1, 1036}_1
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨  p_1035 ∨ -b^{1, 1036}_0
c  in DIMACS:
-4265  4266 -4267  1035  4268 0
-4265  4266 -4267  1035  4269 0
-4265  4266 -4267  1035 -4270 0

c  -2-1 --> break 
c    ( b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-4265 -4266  4267  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1035}_2 ∧ -b^{1, 1035}_1 ∧ -b^{1, 1035}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1035}_2 ∨  b^{1, 1035}_1 ∨  b^{1, 1035}_0 ∨ false 
c  in DIMACS:
-4265  4266  4267  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧ true) 
c  in CNF:
c     b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ false 
c  in DIMACS:
 4265 -4266 -4267  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1035}_2 ∧  b^{1, 1035}_1 ∧  b^{1, 1035}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1035}_2 ∨ -b^{1, 1035}_1 ∨ -b^{1, 1035}_0 ∨ false 
c  in DIMACS:
-4265 -4266 -4267  0

c i = 1036
c  -2+1 --> -1
c    ( b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧  p_1036) -> ( b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0)
c  in CNF:
c    -b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨  b^{1, 1037}_2
c    -b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_1
c    -b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨  b^{1, 1037}_0
c  in DIMACS:
-4268 -4269  4270 -1036  4271 0
-4268 -4269  4270 -1036 -4272 0
-4268 -4269  4270 -1036  4273 0

c  -1+1 --> 0
c    ( b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧  p_1036) -> (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧ -b^{1, 1037}_0)
c  in CNF:
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_2
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_1
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_0
c  in DIMACS:
-4268  4269 -4270 -1036 -4271 0
-4268  4269 -4270 -1036 -4272 0
-4268  4269 -4270 -1036 -4273 0

c  0+1 --> 1
c    (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧  p_1036) -> (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0)
c  in CNF:
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_2
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_1
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨  b^{1, 1037}_0
c  in DIMACS:
 4268  4269  4270 -1036 -4271 0
 4268  4269  4270 -1036 -4272 0
 4268  4269  4270 -1036  4273 0

c  1+1 --> 2
c    (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧  p_1036) -> (-b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0)
c  in CNF:
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_2
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨  b^{1, 1037}_1
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ -p_1036 ∨ -b^{1, 1037}_0
c  in DIMACS:
 4268  4269 -4270 -1036 -4271 0
 4268  4269 -4270 -1036  4272 0
 4268  4269 -4270 -1036 -4273 0

c  2+1 --> break 
c    (-b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 4268 -4269  4270 -1036 1162 0


c  2-1 --> 1
c    (-b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧ -p_1036) -> (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0)
c  in CNF:
c     b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_2
c     b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_1
c     b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨  b^{1, 1037}_0
c  in DIMACS:
 4268 -4269  4270  1036 -4271 0
 4268 -4269  4270  1036 -4272 0
 4268 -4269  4270  1036  4273 0

c  1-1 --> 0
c    (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧ -p_1036) -> (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧ -b^{1, 1037}_0)
c  in CNF:
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_2
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_1
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_0
c  in DIMACS:
 4268  4269 -4270  1036 -4271 0
 4268  4269 -4270  1036 -4272 0
 4268  4269 -4270  1036 -4273 0

c  0-1 --> -1
c    (-b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧ -p_1036) -> ( b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0)
c  in CNF:
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨  b^{1, 1037}_2
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_1
c     b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨  b^{1, 1037}_0
c  in DIMACS:
 4268  4269  4270  1036  4271 0
 4268  4269  4270  1036 -4272 0
 4268  4269  4270  1036  4273 0

c  -1-1 --> -2
c    ( b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧ -p_1036) -> ( b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0)
c  in CNF:
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨  b^{1, 1037}_2
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨  b^{1, 1037}_1
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨  p_1036 ∨ -b^{1, 1037}_0
c  in DIMACS:
-4268  4269 -4270  1036  4271 0
-4268  4269 -4270  1036  4272 0
-4268  4269 -4270  1036 -4273 0

c  -2-1 --> break 
c    ( b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-4268 -4269  4270  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1036}_2 ∧ -b^{1, 1036}_1 ∧ -b^{1, 1036}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1036}_2 ∨  b^{1, 1036}_1 ∨  b^{1, 1036}_0 ∨ false 
c  in DIMACS:
-4268  4269  4270  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧ true) 
c  in CNF:
c     b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ false 
c  in DIMACS:
 4268 -4269 -4270  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1036}_2 ∧  b^{1, 1036}_1 ∧  b^{1, 1036}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1036}_2 ∨ -b^{1, 1036}_1 ∨ -b^{1, 1036}_0 ∨ false 
c  in DIMACS:
-4268 -4269 -4270  0

c i = 1037
c  -2+1 --> -1
c    ( b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧  p_1037) -> ( b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0)
c  in CNF:
c    -b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨  b^{1, 1038}_2
c    -b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_1
c    -b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨  b^{1, 1038}_0
c  in DIMACS:
-4271 -4272  4273 -1037  4274 0
-4271 -4272  4273 -1037 -4275 0
-4271 -4272  4273 -1037  4276 0

c  -1+1 --> 0
c    ( b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧  p_1037) -> (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧ -b^{1, 1038}_0)
c  in CNF:
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_2
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_1
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_0
c  in DIMACS:
-4271  4272 -4273 -1037 -4274 0
-4271  4272 -4273 -1037 -4275 0
-4271  4272 -4273 -1037 -4276 0

c  0+1 --> 1
c    (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧  p_1037) -> (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0)
c  in CNF:
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_2
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_1
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨  b^{1, 1038}_0
c  in DIMACS:
 4271  4272  4273 -1037 -4274 0
 4271  4272  4273 -1037 -4275 0
 4271  4272  4273 -1037  4276 0

c  1+1 --> 2
c    (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧  p_1037) -> (-b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0)
c  in CNF:
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_2
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨  b^{1, 1038}_1
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ -p_1037 ∨ -b^{1, 1038}_0
c  in DIMACS:
 4271  4272 -4273 -1037 -4274 0
 4271  4272 -4273 -1037  4275 0
 4271  4272 -4273 -1037 -4276 0

c  2+1 --> break 
c    (-b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧  p_1037) -> break
c  in CNF:
c     b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ -p_1037 ∨ break
c  in DIMACS:
 4271 -4272  4273 -1037 1162 0


c  2-1 --> 1
c    (-b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧ -p_1037) -> (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0)
c  in CNF:
c     b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_2
c     b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_1
c     b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨  b^{1, 1038}_0
c  in DIMACS:
 4271 -4272  4273  1037 -4274 0
 4271 -4272  4273  1037 -4275 0
 4271 -4272  4273  1037  4276 0

c  1-1 --> 0
c    (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧ -p_1037) -> (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧ -b^{1, 1038}_0)
c  in CNF:
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_2
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_1
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_0
c  in DIMACS:
 4271  4272 -4273  1037 -4274 0
 4271  4272 -4273  1037 -4275 0
 4271  4272 -4273  1037 -4276 0

c  0-1 --> -1
c    (-b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧ -p_1037) -> ( b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0)
c  in CNF:
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨  b^{1, 1038}_2
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_1
c     b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨  b^{1, 1038}_0
c  in DIMACS:
 4271  4272  4273  1037  4274 0
 4271  4272  4273  1037 -4275 0
 4271  4272  4273  1037  4276 0

c  -1-1 --> -2
c    ( b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧ -p_1037) -> ( b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0)
c  in CNF:
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨  b^{1, 1038}_2
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨  b^{1, 1038}_1
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨  p_1037 ∨ -b^{1, 1038}_0
c  in DIMACS:
-4271  4272 -4273  1037  4274 0
-4271  4272 -4273  1037  4275 0
-4271  4272 -4273  1037 -4276 0

c  -2-1 --> break 
c    ( b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧ -p_1037) -> break
c  in CNF:
c    -b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨  p_1037 ∨ break
c  in DIMACS:
-4271 -4272  4273  1037 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1037}_2 ∧ -b^{1, 1037}_1 ∧ -b^{1, 1037}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1037}_2 ∨  b^{1, 1037}_1 ∨  b^{1, 1037}_0 ∨ false 
c  in DIMACS:
-4271  4272  4273  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧ true) 
c  in CNF:
c     b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ false 
c  in DIMACS:
 4271 -4272 -4273  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1037}_2 ∧  b^{1, 1037}_1 ∧  b^{1, 1037}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1037}_2 ∨ -b^{1, 1037}_1 ∨ -b^{1, 1037}_0 ∨ false 
c  in DIMACS:
-4271 -4272 -4273  0

c i = 1038
c  -2+1 --> -1
c    ( b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧  p_1038) -> ( b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0)
c  in CNF:
c    -b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨  b^{1, 1039}_2
c    -b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_1
c    -b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨  b^{1, 1039}_0
c  in DIMACS:
-4274 -4275  4276 -1038  4277 0
-4274 -4275  4276 -1038 -4278 0
-4274 -4275  4276 -1038  4279 0

c  -1+1 --> 0
c    ( b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧  p_1038) -> (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧ -b^{1, 1039}_0)
c  in CNF:
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_2
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_1
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_0
c  in DIMACS:
-4274  4275 -4276 -1038 -4277 0
-4274  4275 -4276 -1038 -4278 0
-4274  4275 -4276 -1038 -4279 0

c  0+1 --> 1
c    (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧  p_1038) -> (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0)
c  in CNF:
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_2
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_1
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨  b^{1, 1039}_0
c  in DIMACS:
 4274  4275  4276 -1038 -4277 0
 4274  4275  4276 -1038 -4278 0
 4274  4275  4276 -1038  4279 0

c  1+1 --> 2
c    (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧  p_1038) -> (-b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0)
c  in CNF:
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_2
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨  b^{1, 1039}_1
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ -p_1038 ∨ -b^{1, 1039}_0
c  in DIMACS:
 4274  4275 -4276 -1038 -4277 0
 4274  4275 -4276 -1038  4278 0
 4274  4275 -4276 -1038 -4279 0

c  2+1 --> break 
c    (-b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 4274 -4275  4276 -1038 1162 0


c  2-1 --> 1
c    (-b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧ -p_1038) -> (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0)
c  in CNF:
c     b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_2
c     b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_1
c     b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨  b^{1, 1039}_0
c  in DIMACS:
 4274 -4275  4276  1038 -4277 0
 4274 -4275  4276  1038 -4278 0
 4274 -4275  4276  1038  4279 0

c  1-1 --> 0
c    (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧ -p_1038) -> (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧ -b^{1, 1039}_0)
c  in CNF:
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_2
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_1
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_0
c  in DIMACS:
 4274  4275 -4276  1038 -4277 0
 4274  4275 -4276  1038 -4278 0
 4274  4275 -4276  1038 -4279 0

c  0-1 --> -1
c    (-b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧ -p_1038) -> ( b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0)
c  in CNF:
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨  b^{1, 1039}_2
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_1
c     b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨  b^{1, 1039}_0
c  in DIMACS:
 4274  4275  4276  1038  4277 0
 4274  4275  4276  1038 -4278 0
 4274  4275  4276  1038  4279 0

c  -1-1 --> -2
c    ( b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧ -p_1038) -> ( b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0)
c  in CNF:
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨  b^{1, 1039}_2
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨  b^{1, 1039}_1
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨  p_1038 ∨ -b^{1, 1039}_0
c  in DIMACS:
-4274  4275 -4276  1038  4277 0
-4274  4275 -4276  1038  4278 0
-4274  4275 -4276  1038 -4279 0

c  -2-1 --> break 
c    ( b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-4274 -4275  4276  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1038}_2 ∧ -b^{1, 1038}_1 ∧ -b^{1, 1038}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1038}_2 ∨  b^{1, 1038}_1 ∨  b^{1, 1038}_0 ∨ false 
c  in DIMACS:
-4274  4275  4276  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧ true) 
c  in CNF:
c     b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ false 
c  in DIMACS:
 4274 -4275 -4276  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1038}_2 ∧  b^{1, 1038}_1 ∧  b^{1, 1038}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1038}_2 ∨ -b^{1, 1038}_1 ∨ -b^{1, 1038}_0 ∨ false 
c  in DIMACS:
-4274 -4275 -4276  0

c i = 1039
c  -2+1 --> -1
c    ( b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧  p_1039) -> ( b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0)
c  in CNF:
c    -b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨  b^{1, 1040}_2
c    -b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_1
c    -b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨  b^{1, 1040}_0
c  in DIMACS:
-4277 -4278  4279 -1039  4280 0
-4277 -4278  4279 -1039 -4281 0
-4277 -4278  4279 -1039  4282 0

c  -1+1 --> 0
c    ( b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧  p_1039) -> (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧ -b^{1, 1040}_0)
c  in CNF:
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_2
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_1
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_0
c  in DIMACS:
-4277  4278 -4279 -1039 -4280 0
-4277  4278 -4279 -1039 -4281 0
-4277  4278 -4279 -1039 -4282 0

c  0+1 --> 1
c    (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧  p_1039) -> (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0)
c  in CNF:
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_2
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_1
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨  b^{1, 1040}_0
c  in DIMACS:
 4277  4278  4279 -1039 -4280 0
 4277  4278  4279 -1039 -4281 0
 4277  4278  4279 -1039  4282 0

c  1+1 --> 2
c    (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧  p_1039) -> (-b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0)
c  in CNF:
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_2
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨  b^{1, 1040}_1
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ -p_1039 ∨ -b^{1, 1040}_0
c  in DIMACS:
 4277  4278 -4279 -1039 -4280 0
 4277  4278 -4279 -1039  4281 0
 4277  4278 -4279 -1039 -4282 0

c  2+1 --> break 
c    (-b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧  p_1039) -> break
c  in CNF:
c     b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ -p_1039 ∨ break
c  in DIMACS:
 4277 -4278  4279 -1039 1162 0


c  2-1 --> 1
c    (-b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧ -p_1039) -> (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0)
c  in CNF:
c     b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_2
c     b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_1
c     b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨  b^{1, 1040}_0
c  in DIMACS:
 4277 -4278  4279  1039 -4280 0
 4277 -4278  4279  1039 -4281 0
 4277 -4278  4279  1039  4282 0

c  1-1 --> 0
c    (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧ -p_1039) -> (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧ -b^{1, 1040}_0)
c  in CNF:
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_2
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_1
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_0
c  in DIMACS:
 4277  4278 -4279  1039 -4280 0
 4277  4278 -4279  1039 -4281 0
 4277  4278 -4279  1039 -4282 0

c  0-1 --> -1
c    (-b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧ -p_1039) -> ( b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0)
c  in CNF:
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨  b^{1, 1040}_2
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_1
c     b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨  b^{1, 1040}_0
c  in DIMACS:
 4277  4278  4279  1039  4280 0
 4277  4278  4279  1039 -4281 0
 4277  4278  4279  1039  4282 0

c  -1-1 --> -2
c    ( b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧ -p_1039) -> ( b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0)
c  in CNF:
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨  b^{1, 1040}_2
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨  b^{1, 1040}_1
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨  p_1039 ∨ -b^{1, 1040}_0
c  in DIMACS:
-4277  4278 -4279  1039  4280 0
-4277  4278 -4279  1039  4281 0
-4277  4278 -4279  1039 -4282 0

c  -2-1 --> break 
c    ( b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧ -p_1039) -> break
c  in CNF:
c    -b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨  p_1039 ∨ break
c  in DIMACS:
-4277 -4278  4279  1039 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1039}_2 ∧ -b^{1, 1039}_1 ∧ -b^{1, 1039}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1039}_2 ∨  b^{1, 1039}_1 ∨  b^{1, 1039}_0 ∨ false 
c  in DIMACS:
-4277  4278  4279  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧ true) 
c  in CNF:
c     b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ false 
c  in DIMACS:
 4277 -4278 -4279  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1039}_2 ∧  b^{1, 1039}_1 ∧  b^{1, 1039}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1039}_2 ∨ -b^{1, 1039}_1 ∨ -b^{1, 1039}_0 ∨ false 
c  in DIMACS:
-4277 -4278 -4279  0

c i = 1040
c  -2+1 --> -1
c    ( b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧  p_1040) -> ( b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0)
c  in CNF:
c    -b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨  b^{1, 1041}_2
c    -b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_1
c    -b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨  b^{1, 1041}_0
c  in DIMACS:
-4280 -4281  4282 -1040  4283 0
-4280 -4281  4282 -1040 -4284 0
-4280 -4281  4282 -1040  4285 0

c  -1+1 --> 0
c    ( b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧  p_1040) -> (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧ -b^{1, 1041}_0)
c  in CNF:
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_2
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_1
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_0
c  in DIMACS:
-4280  4281 -4282 -1040 -4283 0
-4280  4281 -4282 -1040 -4284 0
-4280  4281 -4282 -1040 -4285 0

c  0+1 --> 1
c    (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧  p_1040) -> (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0)
c  in CNF:
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_2
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_1
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨  b^{1, 1041}_0
c  in DIMACS:
 4280  4281  4282 -1040 -4283 0
 4280  4281  4282 -1040 -4284 0
 4280  4281  4282 -1040  4285 0

c  1+1 --> 2
c    (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧  p_1040) -> (-b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0)
c  in CNF:
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_2
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨  b^{1, 1041}_1
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ -p_1040 ∨ -b^{1, 1041}_0
c  in DIMACS:
 4280  4281 -4282 -1040 -4283 0
 4280  4281 -4282 -1040  4284 0
 4280  4281 -4282 -1040 -4285 0

c  2+1 --> break 
c    (-b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 4280 -4281  4282 -1040 1162 0


c  2-1 --> 1
c    (-b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧ -p_1040) -> (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0)
c  in CNF:
c     b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_2
c     b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_1
c     b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨  b^{1, 1041}_0
c  in DIMACS:
 4280 -4281  4282  1040 -4283 0
 4280 -4281  4282  1040 -4284 0
 4280 -4281  4282  1040  4285 0

c  1-1 --> 0
c    (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧ -p_1040) -> (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧ -b^{1, 1041}_0)
c  in CNF:
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_2
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_1
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_0
c  in DIMACS:
 4280  4281 -4282  1040 -4283 0
 4280  4281 -4282  1040 -4284 0
 4280  4281 -4282  1040 -4285 0

c  0-1 --> -1
c    (-b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧ -p_1040) -> ( b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0)
c  in CNF:
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨  b^{1, 1041}_2
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_1
c     b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨  b^{1, 1041}_0
c  in DIMACS:
 4280  4281  4282  1040  4283 0
 4280  4281  4282  1040 -4284 0
 4280  4281  4282  1040  4285 0

c  -1-1 --> -2
c    ( b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧ -p_1040) -> ( b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0)
c  in CNF:
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨  b^{1, 1041}_2
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨  b^{1, 1041}_1
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨  p_1040 ∨ -b^{1, 1041}_0
c  in DIMACS:
-4280  4281 -4282  1040  4283 0
-4280  4281 -4282  1040  4284 0
-4280  4281 -4282  1040 -4285 0

c  -2-1 --> break 
c    ( b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-4280 -4281  4282  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1040}_2 ∧ -b^{1, 1040}_1 ∧ -b^{1, 1040}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1040}_2 ∨  b^{1, 1040}_1 ∨  b^{1, 1040}_0 ∨ false 
c  in DIMACS:
-4280  4281  4282  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧ true) 
c  in CNF:
c     b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ false 
c  in DIMACS:
 4280 -4281 -4282  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1040}_2 ∧  b^{1, 1040}_1 ∧  b^{1, 1040}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1040}_2 ∨ -b^{1, 1040}_1 ∨ -b^{1, 1040}_0 ∨ false 
c  in DIMACS:
-4280 -4281 -4282  0

c i = 1041
c  -2+1 --> -1
c    ( b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧  p_1041) -> ( b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0)
c  in CNF:
c    -b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨  b^{1, 1042}_2
c    -b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_1
c    -b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨  b^{1, 1042}_0
c  in DIMACS:
-4283 -4284  4285 -1041  4286 0
-4283 -4284  4285 -1041 -4287 0
-4283 -4284  4285 -1041  4288 0

c  -1+1 --> 0
c    ( b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧  p_1041) -> (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧ -b^{1, 1042}_0)
c  in CNF:
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_2
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_1
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_0
c  in DIMACS:
-4283  4284 -4285 -1041 -4286 0
-4283  4284 -4285 -1041 -4287 0
-4283  4284 -4285 -1041 -4288 0

c  0+1 --> 1
c    (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧  p_1041) -> (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0)
c  in CNF:
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_2
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_1
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨  b^{1, 1042}_0
c  in DIMACS:
 4283  4284  4285 -1041 -4286 0
 4283  4284  4285 -1041 -4287 0
 4283  4284  4285 -1041  4288 0

c  1+1 --> 2
c    (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧  p_1041) -> (-b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0)
c  in CNF:
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_2
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨  b^{1, 1042}_1
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ -p_1041 ∨ -b^{1, 1042}_0
c  in DIMACS:
 4283  4284 -4285 -1041 -4286 0
 4283  4284 -4285 -1041  4287 0
 4283  4284 -4285 -1041 -4288 0

c  2+1 --> break 
c    (-b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧  p_1041) -> break
c  in CNF:
c     b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ -p_1041 ∨ break
c  in DIMACS:
 4283 -4284  4285 -1041 1162 0


c  2-1 --> 1
c    (-b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧ -p_1041) -> (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0)
c  in CNF:
c     b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_2
c     b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_1
c     b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨  b^{1, 1042}_0
c  in DIMACS:
 4283 -4284  4285  1041 -4286 0
 4283 -4284  4285  1041 -4287 0
 4283 -4284  4285  1041  4288 0

c  1-1 --> 0
c    (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧ -p_1041) -> (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧ -b^{1, 1042}_0)
c  in CNF:
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_2
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_1
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_0
c  in DIMACS:
 4283  4284 -4285  1041 -4286 0
 4283  4284 -4285  1041 -4287 0
 4283  4284 -4285  1041 -4288 0

c  0-1 --> -1
c    (-b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧ -p_1041) -> ( b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0)
c  in CNF:
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨  b^{1, 1042}_2
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_1
c     b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨  b^{1, 1042}_0
c  in DIMACS:
 4283  4284  4285  1041  4286 0
 4283  4284  4285  1041 -4287 0
 4283  4284  4285  1041  4288 0

c  -1-1 --> -2
c    ( b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧ -p_1041) -> ( b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0)
c  in CNF:
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨  b^{1, 1042}_2
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨  b^{1, 1042}_1
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨  p_1041 ∨ -b^{1, 1042}_0
c  in DIMACS:
-4283  4284 -4285  1041  4286 0
-4283  4284 -4285  1041  4287 0
-4283  4284 -4285  1041 -4288 0

c  -2-1 --> break 
c    ( b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧ -p_1041) -> break
c  in CNF:
c    -b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨  p_1041 ∨ break
c  in DIMACS:
-4283 -4284  4285  1041 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1041}_2 ∧ -b^{1, 1041}_1 ∧ -b^{1, 1041}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1041}_2 ∨  b^{1, 1041}_1 ∨  b^{1, 1041}_0 ∨ false 
c  in DIMACS:
-4283  4284  4285  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧ true) 
c  in CNF:
c     b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ false 
c  in DIMACS:
 4283 -4284 -4285  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1041}_2 ∧  b^{1, 1041}_1 ∧  b^{1, 1041}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1041}_2 ∨ -b^{1, 1041}_1 ∨ -b^{1, 1041}_0 ∨ false 
c  in DIMACS:
-4283 -4284 -4285  0

c i = 1042
c  -2+1 --> -1
c    ( b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧  p_1042) -> ( b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0)
c  in CNF:
c    -b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨  b^{1, 1043}_2
c    -b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_1
c    -b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨  b^{1, 1043}_0
c  in DIMACS:
-4286 -4287  4288 -1042  4289 0
-4286 -4287  4288 -1042 -4290 0
-4286 -4287  4288 -1042  4291 0

c  -1+1 --> 0
c    ( b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧  p_1042) -> (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧ -b^{1, 1043}_0)
c  in CNF:
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_2
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_1
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_0
c  in DIMACS:
-4286  4287 -4288 -1042 -4289 0
-4286  4287 -4288 -1042 -4290 0
-4286  4287 -4288 -1042 -4291 0

c  0+1 --> 1
c    (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧  p_1042) -> (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0)
c  in CNF:
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_2
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_1
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨  b^{1, 1043}_0
c  in DIMACS:
 4286  4287  4288 -1042 -4289 0
 4286  4287  4288 -1042 -4290 0
 4286  4287  4288 -1042  4291 0

c  1+1 --> 2
c    (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧  p_1042) -> (-b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0)
c  in CNF:
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_2
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨  b^{1, 1043}_1
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ -p_1042 ∨ -b^{1, 1043}_0
c  in DIMACS:
 4286  4287 -4288 -1042 -4289 0
 4286  4287 -4288 -1042  4290 0
 4286  4287 -4288 -1042 -4291 0

c  2+1 --> break 
c    (-b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧  p_1042) -> break
c  in CNF:
c     b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ -p_1042 ∨ break
c  in DIMACS:
 4286 -4287  4288 -1042 1162 0


c  2-1 --> 1
c    (-b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧ -p_1042) -> (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0)
c  in CNF:
c     b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_2
c     b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_1
c     b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨  b^{1, 1043}_0
c  in DIMACS:
 4286 -4287  4288  1042 -4289 0
 4286 -4287  4288  1042 -4290 0
 4286 -4287  4288  1042  4291 0

c  1-1 --> 0
c    (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧ -p_1042) -> (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧ -b^{1, 1043}_0)
c  in CNF:
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_2
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_1
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_0
c  in DIMACS:
 4286  4287 -4288  1042 -4289 0
 4286  4287 -4288  1042 -4290 0
 4286  4287 -4288  1042 -4291 0

c  0-1 --> -1
c    (-b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧ -p_1042) -> ( b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0)
c  in CNF:
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨  b^{1, 1043}_2
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_1
c     b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨  b^{1, 1043}_0
c  in DIMACS:
 4286  4287  4288  1042  4289 0
 4286  4287  4288  1042 -4290 0
 4286  4287  4288  1042  4291 0

c  -1-1 --> -2
c    ( b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧ -p_1042) -> ( b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0)
c  in CNF:
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨  b^{1, 1043}_2
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨  b^{1, 1043}_1
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨  p_1042 ∨ -b^{1, 1043}_0
c  in DIMACS:
-4286  4287 -4288  1042  4289 0
-4286  4287 -4288  1042  4290 0
-4286  4287 -4288  1042 -4291 0

c  -2-1 --> break 
c    ( b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧ -p_1042) -> break
c  in CNF:
c    -b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨  p_1042 ∨ break
c  in DIMACS:
-4286 -4287  4288  1042 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1042}_2 ∧ -b^{1, 1042}_1 ∧ -b^{1, 1042}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1042}_2 ∨  b^{1, 1042}_1 ∨  b^{1, 1042}_0 ∨ false 
c  in DIMACS:
-4286  4287  4288  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧ true) 
c  in CNF:
c     b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ false 
c  in DIMACS:
 4286 -4287 -4288  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1042}_2 ∧  b^{1, 1042}_1 ∧  b^{1, 1042}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1042}_2 ∨ -b^{1, 1042}_1 ∨ -b^{1, 1042}_0 ∨ false 
c  in DIMACS:
-4286 -4287 -4288  0

c i = 1043
c  -2+1 --> -1
c    ( b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧  p_1043) -> ( b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0)
c  in CNF:
c    -b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨  b^{1, 1044}_2
c    -b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_1
c    -b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨  b^{1, 1044}_0
c  in DIMACS:
-4289 -4290  4291 -1043  4292 0
-4289 -4290  4291 -1043 -4293 0
-4289 -4290  4291 -1043  4294 0

c  -1+1 --> 0
c    ( b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧  p_1043) -> (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧ -b^{1, 1044}_0)
c  in CNF:
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_2
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_1
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_0
c  in DIMACS:
-4289  4290 -4291 -1043 -4292 0
-4289  4290 -4291 -1043 -4293 0
-4289  4290 -4291 -1043 -4294 0

c  0+1 --> 1
c    (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧  p_1043) -> (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0)
c  in CNF:
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_2
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_1
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨  b^{1, 1044}_0
c  in DIMACS:
 4289  4290  4291 -1043 -4292 0
 4289  4290  4291 -1043 -4293 0
 4289  4290  4291 -1043  4294 0

c  1+1 --> 2
c    (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧  p_1043) -> (-b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0)
c  in CNF:
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_2
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨  b^{1, 1044}_1
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ -p_1043 ∨ -b^{1, 1044}_0
c  in DIMACS:
 4289  4290 -4291 -1043 -4292 0
 4289  4290 -4291 -1043  4293 0
 4289  4290 -4291 -1043 -4294 0

c  2+1 --> break 
c    (-b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧  p_1043) -> break
c  in CNF:
c     b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ -p_1043 ∨ break
c  in DIMACS:
 4289 -4290  4291 -1043 1162 0


c  2-1 --> 1
c    (-b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧ -p_1043) -> (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0)
c  in CNF:
c     b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_2
c     b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_1
c     b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨  b^{1, 1044}_0
c  in DIMACS:
 4289 -4290  4291  1043 -4292 0
 4289 -4290  4291  1043 -4293 0
 4289 -4290  4291  1043  4294 0

c  1-1 --> 0
c    (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧ -p_1043) -> (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧ -b^{1, 1044}_0)
c  in CNF:
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_2
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_1
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_0
c  in DIMACS:
 4289  4290 -4291  1043 -4292 0
 4289  4290 -4291  1043 -4293 0
 4289  4290 -4291  1043 -4294 0

c  0-1 --> -1
c    (-b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧ -p_1043) -> ( b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0)
c  in CNF:
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨  b^{1, 1044}_2
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_1
c     b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨  b^{1, 1044}_0
c  in DIMACS:
 4289  4290  4291  1043  4292 0
 4289  4290  4291  1043 -4293 0
 4289  4290  4291  1043  4294 0

c  -1-1 --> -2
c    ( b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧ -p_1043) -> ( b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0)
c  in CNF:
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨  b^{1, 1044}_2
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨  b^{1, 1044}_1
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨  p_1043 ∨ -b^{1, 1044}_0
c  in DIMACS:
-4289  4290 -4291  1043  4292 0
-4289  4290 -4291  1043  4293 0
-4289  4290 -4291  1043 -4294 0

c  -2-1 --> break 
c    ( b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧ -p_1043) -> break
c  in CNF:
c    -b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨  p_1043 ∨ break
c  in DIMACS:
-4289 -4290  4291  1043 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1043}_2 ∧ -b^{1, 1043}_1 ∧ -b^{1, 1043}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1043}_2 ∨  b^{1, 1043}_1 ∨  b^{1, 1043}_0 ∨ false 
c  in DIMACS:
-4289  4290  4291  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧ true) 
c  in CNF:
c     b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ false 
c  in DIMACS:
 4289 -4290 -4291  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1043}_2 ∧  b^{1, 1043}_1 ∧  b^{1, 1043}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1043}_2 ∨ -b^{1, 1043}_1 ∨ -b^{1, 1043}_0 ∨ false 
c  in DIMACS:
-4289 -4290 -4291  0

c i = 1044
c  -2+1 --> -1
c    ( b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧  p_1044) -> ( b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0)
c  in CNF:
c    -b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨  b^{1, 1045}_2
c    -b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_1
c    -b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨  b^{1, 1045}_0
c  in DIMACS:
-4292 -4293  4294 -1044  4295 0
-4292 -4293  4294 -1044 -4296 0
-4292 -4293  4294 -1044  4297 0

c  -1+1 --> 0
c    ( b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧  p_1044) -> (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧ -b^{1, 1045}_0)
c  in CNF:
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_2
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_1
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_0
c  in DIMACS:
-4292  4293 -4294 -1044 -4295 0
-4292  4293 -4294 -1044 -4296 0
-4292  4293 -4294 -1044 -4297 0

c  0+1 --> 1
c    (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧  p_1044) -> (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0)
c  in CNF:
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_2
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_1
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨  b^{1, 1045}_0
c  in DIMACS:
 4292  4293  4294 -1044 -4295 0
 4292  4293  4294 -1044 -4296 0
 4292  4293  4294 -1044  4297 0

c  1+1 --> 2
c    (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧  p_1044) -> (-b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0)
c  in CNF:
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_2
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨  b^{1, 1045}_1
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ -p_1044 ∨ -b^{1, 1045}_0
c  in DIMACS:
 4292  4293 -4294 -1044 -4295 0
 4292  4293 -4294 -1044  4296 0
 4292  4293 -4294 -1044 -4297 0

c  2+1 --> break 
c    (-b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 4292 -4293  4294 -1044 1162 0


c  2-1 --> 1
c    (-b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧ -p_1044) -> (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0)
c  in CNF:
c     b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_2
c     b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_1
c     b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨  b^{1, 1045}_0
c  in DIMACS:
 4292 -4293  4294  1044 -4295 0
 4292 -4293  4294  1044 -4296 0
 4292 -4293  4294  1044  4297 0

c  1-1 --> 0
c    (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧ -p_1044) -> (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧ -b^{1, 1045}_0)
c  in CNF:
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_2
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_1
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_0
c  in DIMACS:
 4292  4293 -4294  1044 -4295 0
 4292  4293 -4294  1044 -4296 0
 4292  4293 -4294  1044 -4297 0

c  0-1 --> -1
c    (-b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧ -p_1044) -> ( b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0)
c  in CNF:
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨  b^{1, 1045}_2
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_1
c     b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨  b^{1, 1045}_0
c  in DIMACS:
 4292  4293  4294  1044  4295 0
 4292  4293  4294  1044 -4296 0
 4292  4293  4294  1044  4297 0

c  -1-1 --> -2
c    ( b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧ -p_1044) -> ( b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0)
c  in CNF:
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨  b^{1, 1045}_2
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨  b^{1, 1045}_1
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨  p_1044 ∨ -b^{1, 1045}_0
c  in DIMACS:
-4292  4293 -4294  1044  4295 0
-4292  4293 -4294  1044  4296 0
-4292  4293 -4294  1044 -4297 0

c  -2-1 --> break 
c    ( b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-4292 -4293  4294  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1044}_2 ∧ -b^{1, 1044}_1 ∧ -b^{1, 1044}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1044}_2 ∨  b^{1, 1044}_1 ∨  b^{1, 1044}_0 ∨ false 
c  in DIMACS:
-4292  4293  4294  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧ true) 
c  in CNF:
c     b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ false 
c  in DIMACS:
 4292 -4293 -4294  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1044}_2 ∧  b^{1, 1044}_1 ∧  b^{1, 1044}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1044}_2 ∨ -b^{1, 1044}_1 ∨ -b^{1, 1044}_0 ∨ false 
c  in DIMACS:
-4292 -4293 -4294  0

c i = 1045
c  -2+1 --> -1
c    ( b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧  p_1045) -> ( b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0)
c  in CNF:
c    -b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨  b^{1, 1046}_2
c    -b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_1
c    -b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨  b^{1, 1046}_0
c  in DIMACS:
-4295 -4296  4297 -1045  4298 0
-4295 -4296  4297 -1045 -4299 0
-4295 -4296  4297 -1045  4300 0

c  -1+1 --> 0
c    ( b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧  p_1045) -> (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧ -b^{1, 1046}_0)
c  in CNF:
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_2
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_1
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_0
c  in DIMACS:
-4295  4296 -4297 -1045 -4298 0
-4295  4296 -4297 -1045 -4299 0
-4295  4296 -4297 -1045 -4300 0

c  0+1 --> 1
c    (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧  p_1045) -> (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0)
c  in CNF:
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_2
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_1
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨  b^{1, 1046}_0
c  in DIMACS:
 4295  4296  4297 -1045 -4298 0
 4295  4296  4297 -1045 -4299 0
 4295  4296  4297 -1045  4300 0

c  1+1 --> 2
c    (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧  p_1045) -> (-b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0)
c  in CNF:
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_2
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨  b^{1, 1046}_1
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ -p_1045 ∨ -b^{1, 1046}_0
c  in DIMACS:
 4295  4296 -4297 -1045 -4298 0
 4295  4296 -4297 -1045  4299 0
 4295  4296 -4297 -1045 -4300 0

c  2+1 --> break 
c    (-b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 4295 -4296  4297 -1045 1162 0


c  2-1 --> 1
c    (-b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧ -p_1045) -> (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0)
c  in CNF:
c     b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_2
c     b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_1
c     b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨  b^{1, 1046}_0
c  in DIMACS:
 4295 -4296  4297  1045 -4298 0
 4295 -4296  4297  1045 -4299 0
 4295 -4296  4297  1045  4300 0

c  1-1 --> 0
c    (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧ -p_1045) -> (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧ -b^{1, 1046}_0)
c  in CNF:
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_2
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_1
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_0
c  in DIMACS:
 4295  4296 -4297  1045 -4298 0
 4295  4296 -4297  1045 -4299 0
 4295  4296 -4297  1045 -4300 0

c  0-1 --> -1
c    (-b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧ -p_1045) -> ( b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0)
c  in CNF:
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨  b^{1, 1046}_2
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_1
c     b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨  b^{1, 1046}_0
c  in DIMACS:
 4295  4296  4297  1045  4298 0
 4295  4296  4297  1045 -4299 0
 4295  4296  4297  1045  4300 0

c  -1-1 --> -2
c    ( b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧ -p_1045) -> ( b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0)
c  in CNF:
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨  b^{1, 1046}_2
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨  b^{1, 1046}_1
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨  p_1045 ∨ -b^{1, 1046}_0
c  in DIMACS:
-4295  4296 -4297  1045  4298 0
-4295  4296 -4297  1045  4299 0
-4295  4296 -4297  1045 -4300 0

c  -2-1 --> break 
c    ( b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-4295 -4296  4297  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1045}_2 ∧ -b^{1, 1045}_1 ∧ -b^{1, 1045}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1045}_2 ∨  b^{1, 1045}_1 ∨  b^{1, 1045}_0 ∨ false 
c  in DIMACS:
-4295  4296  4297  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧ true) 
c  in CNF:
c     b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ false 
c  in DIMACS:
 4295 -4296 -4297  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1045}_2 ∧  b^{1, 1045}_1 ∧  b^{1, 1045}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1045}_2 ∨ -b^{1, 1045}_1 ∨ -b^{1, 1045}_0 ∨ false 
c  in DIMACS:
-4295 -4296 -4297  0

c i = 1046
c  -2+1 --> -1
c    ( b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧  p_1046) -> ( b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0)
c  in CNF:
c    -b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨  b^{1, 1047}_2
c    -b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_1
c    -b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨  b^{1, 1047}_0
c  in DIMACS:
-4298 -4299  4300 -1046  4301 0
-4298 -4299  4300 -1046 -4302 0
-4298 -4299  4300 -1046  4303 0

c  -1+1 --> 0
c    ( b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧  p_1046) -> (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧ -b^{1, 1047}_0)
c  in CNF:
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_2
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_1
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_0
c  in DIMACS:
-4298  4299 -4300 -1046 -4301 0
-4298  4299 -4300 -1046 -4302 0
-4298  4299 -4300 -1046 -4303 0

c  0+1 --> 1
c    (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧  p_1046) -> (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0)
c  in CNF:
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_2
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_1
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨  b^{1, 1047}_0
c  in DIMACS:
 4298  4299  4300 -1046 -4301 0
 4298  4299  4300 -1046 -4302 0
 4298  4299  4300 -1046  4303 0

c  1+1 --> 2
c    (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧  p_1046) -> (-b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0)
c  in CNF:
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_2
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨  b^{1, 1047}_1
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ -p_1046 ∨ -b^{1, 1047}_0
c  in DIMACS:
 4298  4299 -4300 -1046 -4301 0
 4298  4299 -4300 -1046  4302 0
 4298  4299 -4300 -1046 -4303 0

c  2+1 --> break 
c    (-b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧  p_1046) -> break
c  in CNF:
c     b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ -p_1046 ∨ break
c  in DIMACS:
 4298 -4299  4300 -1046 1162 0


c  2-1 --> 1
c    (-b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧ -p_1046) -> (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0)
c  in CNF:
c     b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_2
c     b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_1
c     b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨  b^{1, 1047}_0
c  in DIMACS:
 4298 -4299  4300  1046 -4301 0
 4298 -4299  4300  1046 -4302 0
 4298 -4299  4300  1046  4303 0

c  1-1 --> 0
c    (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧ -p_1046) -> (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧ -b^{1, 1047}_0)
c  in CNF:
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_2
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_1
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_0
c  in DIMACS:
 4298  4299 -4300  1046 -4301 0
 4298  4299 -4300  1046 -4302 0
 4298  4299 -4300  1046 -4303 0

c  0-1 --> -1
c    (-b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧ -p_1046) -> ( b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0)
c  in CNF:
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨  b^{1, 1047}_2
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_1
c     b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨  b^{1, 1047}_0
c  in DIMACS:
 4298  4299  4300  1046  4301 0
 4298  4299  4300  1046 -4302 0
 4298  4299  4300  1046  4303 0

c  -1-1 --> -2
c    ( b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧ -p_1046) -> ( b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0)
c  in CNF:
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨  b^{1, 1047}_2
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨  b^{1, 1047}_1
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨  p_1046 ∨ -b^{1, 1047}_0
c  in DIMACS:
-4298  4299 -4300  1046  4301 0
-4298  4299 -4300  1046  4302 0
-4298  4299 -4300  1046 -4303 0

c  -2-1 --> break 
c    ( b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧ -p_1046) -> break
c  in CNF:
c    -b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨  p_1046 ∨ break
c  in DIMACS:
-4298 -4299  4300  1046 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1046}_2 ∧ -b^{1, 1046}_1 ∧ -b^{1, 1046}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1046}_2 ∨  b^{1, 1046}_1 ∨  b^{1, 1046}_0 ∨ false 
c  in DIMACS:
-4298  4299  4300  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧ true) 
c  in CNF:
c     b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ false 
c  in DIMACS:
 4298 -4299 -4300  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1046}_2 ∧  b^{1, 1046}_1 ∧  b^{1, 1046}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1046}_2 ∨ -b^{1, 1046}_1 ∨ -b^{1, 1046}_0 ∨ false 
c  in DIMACS:
-4298 -4299 -4300  0

c i = 1047
c  -2+1 --> -1
c    ( b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧  p_1047) -> ( b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0)
c  in CNF:
c    -b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨  b^{1, 1048}_2
c    -b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_1
c    -b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨  b^{1, 1048}_0
c  in DIMACS:
-4301 -4302  4303 -1047  4304 0
-4301 -4302  4303 -1047 -4305 0
-4301 -4302  4303 -1047  4306 0

c  -1+1 --> 0
c    ( b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧  p_1047) -> (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧ -b^{1, 1048}_0)
c  in CNF:
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_2
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_1
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_0
c  in DIMACS:
-4301  4302 -4303 -1047 -4304 0
-4301  4302 -4303 -1047 -4305 0
-4301  4302 -4303 -1047 -4306 0

c  0+1 --> 1
c    (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧  p_1047) -> (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0)
c  in CNF:
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_2
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_1
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨  b^{1, 1048}_0
c  in DIMACS:
 4301  4302  4303 -1047 -4304 0
 4301  4302  4303 -1047 -4305 0
 4301  4302  4303 -1047  4306 0

c  1+1 --> 2
c    (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧  p_1047) -> (-b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0)
c  in CNF:
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_2
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨  b^{1, 1048}_1
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ -p_1047 ∨ -b^{1, 1048}_0
c  in DIMACS:
 4301  4302 -4303 -1047 -4304 0
 4301  4302 -4303 -1047  4305 0
 4301  4302 -4303 -1047 -4306 0

c  2+1 --> break 
c    (-b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧  p_1047) -> break
c  in CNF:
c     b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ -p_1047 ∨ break
c  in DIMACS:
 4301 -4302  4303 -1047 1162 0


c  2-1 --> 1
c    (-b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧ -p_1047) -> (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0)
c  in CNF:
c     b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_2
c     b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_1
c     b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨  b^{1, 1048}_0
c  in DIMACS:
 4301 -4302  4303  1047 -4304 0
 4301 -4302  4303  1047 -4305 0
 4301 -4302  4303  1047  4306 0

c  1-1 --> 0
c    (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧ -p_1047) -> (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧ -b^{1, 1048}_0)
c  in CNF:
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_2
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_1
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_0
c  in DIMACS:
 4301  4302 -4303  1047 -4304 0
 4301  4302 -4303  1047 -4305 0
 4301  4302 -4303  1047 -4306 0

c  0-1 --> -1
c    (-b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧ -p_1047) -> ( b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0)
c  in CNF:
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨  b^{1, 1048}_2
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_1
c     b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨  b^{1, 1048}_0
c  in DIMACS:
 4301  4302  4303  1047  4304 0
 4301  4302  4303  1047 -4305 0
 4301  4302  4303  1047  4306 0

c  -1-1 --> -2
c    ( b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧ -p_1047) -> ( b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0)
c  in CNF:
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨  b^{1, 1048}_2
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨  b^{1, 1048}_1
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨  p_1047 ∨ -b^{1, 1048}_0
c  in DIMACS:
-4301  4302 -4303  1047  4304 0
-4301  4302 -4303  1047  4305 0
-4301  4302 -4303  1047 -4306 0

c  -2-1 --> break 
c    ( b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧ -p_1047) -> break
c  in CNF:
c    -b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨  p_1047 ∨ break
c  in DIMACS:
-4301 -4302  4303  1047 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1047}_2 ∧ -b^{1, 1047}_1 ∧ -b^{1, 1047}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1047}_2 ∨  b^{1, 1047}_1 ∨  b^{1, 1047}_0 ∨ false 
c  in DIMACS:
-4301  4302  4303  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧ true) 
c  in CNF:
c     b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ false 
c  in DIMACS:
 4301 -4302 -4303  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1047}_2 ∧  b^{1, 1047}_1 ∧  b^{1, 1047}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1047}_2 ∨ -b^{1, 1047}_1 ∨ -b^{1, 1047}_0 ∨ false 
c  in DIMACS:
-4301 -4302 -4303  0

c i = 1048
c  -2+1 --> -1
c    ( b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧  p_1048) -> ( b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0)
c  in CNF:
c    -b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨  b^{1, 1049}_2
c    -b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_1
c    -b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨  b^{1, 1049}_0
c  in DIMACS:
-4304 -4305  4306 -1048  4307 0
-4304 -4305  4306 -1048 -4308 0
-4304 -4305  4306 -1048  4309 0

c  -1+1 --> 0
c    ( b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧  p_1048) -> (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧ -b^{1, 1049}_0)
c  in CNF:
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_2
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_1
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_0
c  in DIMACS:
-4304  4305 -4306 -1048 -4307 0
-4304  4305 -4306 -1048 -4308 0
-4304  4305 -4306 -1048 -4309 0

c  0+1 --> 1
c    (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧  p_1048) -> (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0)
c  in CNF:
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_2
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_1
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨  b^{1, 1049}_0
c  in DIMACS:
 4304  4305  4306 -1048 -4307 0
 4304  4305  4306 -1048 -4308 0
 4304  4305  4306 -1048  4309 0

c  1+1 --> 2
c    (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧  p_1048) -> (-b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0)
c  in CNF:
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_2
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨  b^{1, 1049}_1
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ -p_1048 ∨ -b^{1, 1049}_0
c  in DIMACS:
 4304  4305 -4306 -1048 -4307 0
 4304  4305 -4306 -1048  4308 0
 4304  4305 -4306 -1048 -4309 0

c  2+1 --> break 
c    (-b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 4304 -4305  4306 -1048 1162 0


c  2-1 --> 1
c    (-b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧ -p_1048) -> (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0)
c  in CNF:
c     b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_2
c     b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_1
c     b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨  b^{1, 1049}_0
c  in DIMACS:
 4304 -4305  4306  1048 -4307 0
 4304 -4305  4306  1048 -4308 0
 4304 -4305  4306  1048  4309 0

c  1-1 --> 0
c    (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧ -p_1048) -> (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧ -b^{1, 1049}_0)
c  in CNF:
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_2
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_1
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_0
c  in DIMACS:
 4304  4305 -4306  1048 -4307 0
 4304  4305 -4306  1048 -4308 0
 4304  4305 -4306  1048 -4309 0

c  0-1 --> -1
c    (-b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧ -p_1048) -> ( b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0)
c  in CNF:
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨  b^{1, 1049}_2
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_1
c     b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨  b^{1, 1049}_0
c  in DIMACS:
 4304  4305  4306  1048  4307 0
 4304  4305  4306  1048 -4308 0
 4304  4305  4306  1048  4309 0

c  -1-1 --> -2
c    ( b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧ -p_1048) -> ( b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0)
c  in CNF:
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨  b^{1, 1049}_2
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨  b^{1, 1049}_1
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨  p_1048 ∨ -b^{1, 1049}_0
c  in DIMACS:
-4304  4305 -4306  1048  4307 0
-4304  4305 -4306  1048  4308 0
-4304  4305 -4306  1048 -4309 0

c  -2-1 --> break 
c    ( b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-4304 -4305  4306  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1048}_2 ∧ -b^{1, 1048}_1 ∧ -b^{1, 1048}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1048}_2 ∨  b^{1, 1048}_1 ∨  b^{1, 1048}_0 ∨ false 
c  in DIMACS:
-4304  4305  4306  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧ true) 
c  in CNF:
c     b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ false 
c  in DIMACS:
 4304 -4305 -4306  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1048}_2 ∧  b^{1, 1048}_1 ∧  b^{1, 1048}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1048}_2 ∨ -b^{1, 1048}_1 ∨ -b^{1, 1048}_0 ∨ false 
c  in DIMACS:
-4304 -4305 -4306  0

c i = 1049
c  -2+1 --> -1
c    ( b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧  p_1049) -> ( b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0)
c  in CNF:
c    -b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨  b^{1, 1050}_2
c    -b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_1
c    -b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨  b^{1, 1050}_0
c  in DIMACS:
-4307 -4308  4309 -1049  4310 0
-4307 -4308  4309 -1049 -4311 0
-4307 -4308  4309 -1049  4312 0

c  -1+1 --> 0
c    ( b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧  p_1049) -> (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧ -b^{1, 1050}_0)
c  in CNF:
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_2
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_1
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_0
c  in DIMACS:
-4307  4308 -4309 -1049 -4310 0
-4307  4308 -4309 -1049 -4311 0
-4307  4308 -4309 -1049 -4312 0

c  0+1 --> 1
c    (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧  p_1049) -> (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0)
c  in CNF:
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_2
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_1
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨  b^{1, 1050}_0
c  in DIMACS:
 4307  4308  4309 -1049 -4310 0
 4307  4308  4309 -1049 -4311 0
 4307  4308  4309 -1049  4312 0

c  1+1 --> 2
c    (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧  p_1049) -> (-b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0)
c  in CNF:
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_2
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨  b^{1, 1050}_1
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ -p_1049 ∨ -b^{1, 1050}_0
c  in DIMACS:
 4307  4308 -4309 -1049 -4310 0
 4307  4308 -4309 -1049  4311 0
 4307  4308 -4309 -1049 -4312 0

c  2+1 --> break 
c    (-b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧  p_1049) -> break
c  in CNF:
c     b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ -p_1049 ∨ break
c  in DIMACS:
 4307 -4308  4309 -1049 1162 0


c  2-1 --> 1
c    (-b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧ -p_1049) -> (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0)
c  in CNF:
c     b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_2
c     b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_1
c     b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨  b^{1, 1050}_0
c  in DIMACS:
 4307 -4308  4309  1049 -4310 0
 4307 -4308  4309  1049 -4311 0
 4307 -4308  4309  1049  4312 0

c  1-1 --> 0
c    (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧ -p_1049) -> (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧ -b^{1, 1050}_0)
c  in CNF:
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_2
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_1
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_0
c  in DIMACS:
 4307  4308 -4309  1049 -4310 0
 4307  4308 -4309  1049 -4311 0
 4307  4308 -4309  1049 -4312 0

c  0-1 --> -1
c    (-b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧ -p_1049) -> ( b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0)
c  in CNF:
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨  b^{1, 1050}_2
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_1
c     b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨  b^{1, 1050}_0
c  in DIMACS:
 4307  4308  4309  1049  4310 0
 4307  4308  4309  1049 -4311 0
 4307  4308  4309  1049  4312 0

c  -1-1 --> -2
c    ( b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧ -p_1049) -> ( b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0)
c  in CNF:
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨  b^{1, 1050}_2
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨  b^{1, 1050}_1
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨  p_1049 ∨ -b^{1, 1050}_0
c  in DIMACS:
-4307  4308 -4309  1049  4310 0
-4307  4308 -4309  1049  4311 0
-4307  4308 -4309  1049 -4312 0

c  -2-1 --> break 
c    ( b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧ -p_1049) -> break
c  in CNF:
c    -b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨  p_1049 ∨ break
c  in DIMACS:
-4307 -4308  4309  1049 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1049}_2 ∧ -b^{1, 1049}_1 ∧ -b^{1, 1049}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1049}_2 ∨  b^{1, 1049}_1 ∨  b^{1, 1049}_0 ∨ false 
c  in DIMACS:
-4307  4308  4309  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧ true) 
c  in CNF:
c     b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ false 
c  in DIMACS:
 4307 -4308 -4309  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1049}_2 ∧  b^{1, 1049}_1 ∧  b^{1, 1049}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1049}_2 ∨ -b^{1, 1049}_1 ∨ -b^{1, 1049}_0 ∨ false 
c  in DIMACS:
-4307 -4308 -4309  0

c i = 1050
c  -2+1 --> -1
c    ( b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧  p_1050) -> ( b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0)
c  in CNF:
c    -b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨  b^{1, 1051}_2
c    -b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_1
c    -b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨  b^{1, 1051}_0
c  in DIMACS:
-4310 -4311  4312 -1050  4313 0
-4310 -4311  4312 -1050 -4314 0
-4310 -4311  4312 -1050  4315 0

c  -1+1 --> 0
c    ( b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧  p_1050) -> (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧ -b^{1, 1051}_0)
c  in CNF:
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_2
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_1
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_0
c  in DIMACS:
-4310  4311 -4312 -1050 -4313 0
-4310  4311 -4312 -1050 -4314 0
-4310  4311 -4312 -1050 -4315 0

c  0+1 --> 1
c    (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧  p_1050) -> (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0)
c  in CNF:
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_2
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_1
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨  b^{1, 1051}_0
c  in DIMACS:
 4310  4311  4312 -1050 -4313 0
 4310  4311  4312 -1050 -4314 0
 4310  4311  4312 -1050  4315 0

c  1+1 --> 2
c    (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧  p_1050) -> (-b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0)
c  in CNF:
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_2
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨  b^{1, 1051}_1
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ -p_1050 ∨ -b^{1, 1051}_0
c  in DIMACS:
 4310  4311 -4312 -1050 -4313 0
 4310  4311 -4312 -1050  4314 0
 4310  4311 -4312 -1050 -4315 0

c  2+1 --> break 
c    (-b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 4310 -4311  4312 -1050 1162 0


c  2-1 --> 1
c    (-b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧ -p_1050) -> (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0)
c  in CNF:
c     b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_2
c     b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_1
c     b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨  b^{1, 1051}_0
c  in DIMACS:
 4310 -4311  4312  1050 -4313 0
 4310 -4311  4312  1050 -4314 0
 4310 -4311  4312  1050  4315 0

c  1-1 --> 0
c    (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧ -p_1050) -> (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧ -b^{1, 1051}_0)
c  in CNF:
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_2
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_1
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_0
c  in DIMACS:
 4310  4311 -4312  1050 -4313 0
 4310  4311 -4312  1050 -4314 0
 4310  4311 -4312  1050 -4315 0

c  0-1 --> -1
c    (-b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧ -p_1050) -> ( b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0)
c  in CNF:
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨  b^{1, 1051}_2
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_1
c     b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨  b^{1, 1051}_0
c  in DIMACS:
 4310  4311  4312  1050  4313 0
 4310  4311  4312  1050 -4314 0
 4310  4311  4312  1050  4315 0

c  -1-1 --> -2
c    ( b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧ -p_1050) -> ( b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0)
c  in CNF:
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨  b^{1, 1051}_2
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨  b^{1, 1051}_1
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨  p_1050 ∨ -b^{1, 1051}_0
c  in DIMACS:
-4310  4311 -4312  1050  4313 0
-4310  4311 -4312  1050  4314 0
-4310  4311 -4312  1050 -4315 0

c  -2-1 --> break 
c    ( b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-4310 -4311  4312  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1050}_2 ∧ -b^{1, 1050}_1 ∧ -b^{1, 1050}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1050}_2 ∨  b^{1, 1050}_1 ∨  b^{1, 1050}_0 ∨ false 
c  in DIMACS:
-4310  4311  4312  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧ true) 
c  in CNF:
c     b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ false 
c  in DIMACS:
 4310 -4311 -4312  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1050}_2 ∧  b^{1, 1050}_1 ∧  b^{1, 1050}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1050}_2 ∨ -b^{1, 1050}_1 ∨ -b^{1, 1050}_0 ∨ false 
c  in DIMACS:
-4310 -4311 -4312  0

c i = 1051
c  -2+1 --> -1
c    ( b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧  p_1051) -> ( b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0)
c  in CNF:
c    -b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨  b^{1, 1052}_2
c    -b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_1
c    -b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨  b^{1, 1052}_0
c  in DIMACS:
-4313 -4314  4315 -1051  4316 0
-4313 -4314  4315 -1051 -4317 0
-4313 -4314  4315 -1051  4318 0

c  -1+1 --> 0
c    ( b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧  p_1051) -> (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧ -b^{1, 1052}_0)
c  in CNF:
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_2
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_1
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_0
c  in DIMACS:
-4313  4314 -4315 -1051 -4316 0
-4313  4314 -4315 -1051 -4317 0
-4313  4314 -4315 -1051 -4318 0

c  0+1 --> 1
c    (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧  p_1051) -> (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0)
c  in CNF:
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_2
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_1
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨  b^{1, 1052}_0
c  in DIMACS:
 4313  4314  4315 -1051 -4316 0
 4313  4314  4315 -1051 -4317 0
 4313  4314  4315 -1051  4318 0

c  1+1 --> 2
c    (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧  p_1051) -> (-b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0)
c  in CNF:
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_2
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨  b^{1, 1052}_1
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ -p_1051 ∨ -b^{1, 1052}_0
c  in DIMACS:
 4313  4314 -4315 -1051 -4316 0
 4313  4314 -4315 -1051  4317 0
 4313  4314 -4315 -1051 -4318 0

c  2+1 --> break 
c    (-b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧  p_1051) -> break
c  in CNF:
c     b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ -p_1051 ∨ break
c  in DIMACS:
 4313 -4314  4315 -1051 1162 0


c  2-1 --> 1
c    (-b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧ -p_1051) -> (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0)
c  in CNF:
c     b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_2
c     b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_1
c     b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨  b^{1, 1052}_0
c  in DIMACS:
 4313 -4314  4315  1051 -4316 0
 4313 -4314  4315  1051 -4317 0
 4313 -4314  4315  1051  4318 0

c  1-1 --> 0
c    (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧ -p_1051) -> (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧ -b^{1, 1052}_0)
c  in CNF:
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_2
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_1
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_0
c  in DIMACS:
 4313  4314 -4315  1051 -4316 0
 4313  4314 -4315  1051 -4317 0
 4313  4314 -4315  1051 -4318 0

c  0-1 --> -1
c    (-b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧ -p_1051) -> ( b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0)
c  in CNF:
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨  b^{1, 1052}_2
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_1
c     b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨  b^{1, 1052}_0
c  in DIMACS:
 4313  4314  4315  1051  4316 0
 4313  4314  4315  1051 -4317 0
 4313  4314  4315  1051  4318 0

c  -1-1 --> -2
c    ( b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧ -p_1051) -> ( b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0)
c  in CNF:
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨  b^{1, 1052}_2
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨  b^{1, 1052}_1
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨  p_1051 ∨ -b^{1, 1052}_0
c  in DIMACS:
-4313  4314 -4315  1051  4316 0
-4313  4314 -4315  1051  4317 0
-4313  4314 -4315  1051 -4318 0

c  -2-1 --> break 
c    ( b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧ -p_1051) -> break
c  in CNF:
c    -b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨  p_1051 ∨ break
c  in DIMACS:
-4313 -4314  4315  1051 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1051}_2 ∧ -b^{1, 1051}_1 ∧ -b^{1, 1051}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1051}_2 ∨  b^{1, 1051}_1 ∨  b^{1, 1051}_0 ∨ false 
c  in DIMACS:
-4313  4314  4315  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧ true) 
c  in CNF:
c     b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ false 
c  in DIMACS:
 4313 -4314 -4315  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1051}_2 ∧  b^{1, 1051}_1 ∧  b^{1, 1051}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1051}_2 ∨ -b^{1, 1051}_1 ∨ -b^{1, 1051}_0 ∨ false 
c  in DIMACS:
-4313 -4314 -4315  0

c i = 1052
c  -2+1 --> -1
c    ( b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧  p_1052) -> ( b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0)
c  in CNF:
c    -b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨  b^{1, 1053}_2
c    -b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_1
c    -b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨  b^{1, 1053}_0
c  in DIMACS:
-4316 -4317  4318 -1052  4319 0
-4316 -4317  4318 -1052 -4320 0
-4316 -4317  4318 -1052  4321 0

c  -1+1 --> 0
c    ( b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧  p_1052) -> (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧ -b^{1, 1053}_0)
c  in CNF:
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_2
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_1
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_0
c  in DIMACS:
-4316  4317 -4318 -1052 -4319 0
-4316  4317 -4318 -1052 -4320 0
-4316  4317 -4318 -1052 -4321 0

c  0+1 --> 1
c    (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧  p_1052) -> (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0)
c  in CNF:
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_2
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_1
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨  b^{1, 1053}_0
c  in DIMACS:
 4316  4317  4318 -1052 -4319 0
 4316  4317  4318 -1052 -4320 0
 4316  4317  4318 -1052  4321 0

c  1+1 --> 2
c    (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧  p_1052) -> (-b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0)
c  in CNF:
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_2
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨  b^{1, 1053}_1
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ -p_1052 ∨ -b^{1, 1053}_0
c  in DIMACS:
 4316  4317 -4318 -1052 -4319 0
 4316  4317 -4318 -1052  4320 0
 4316  4317 -4318 -1052 -4321 0

c  2+1 --> break 
c    (-b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧  p_1052) -> break
c  in CNF:
c     b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ -p_1052 ∨ break
c  in DIMACS:
 4316 -4317  4318 -1052 1162 0


c  2-1 --> 1
c    (-b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧ -p_1052) -> (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0)
c  in CNF:
c     b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_2
c     b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_1
c     b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨  b^{1, 1053}_0
c  in DIMACS:
 4316 -4317  4318  1052 -4319 0
 4316 -4317  4318  1052 -4320 0
 4316 -4317  4318  1052  4321 0

c  1-1 --> 0
c    (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧ -p_1052) -> (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧ -b^{1, 1053}_0)
c  in CNF:
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_2
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_1
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_0
c  in DIMACS:
 4316  4317 -4318  1052 -4319 0
 4316  4317 -4318  1052 -4320 0
 4316  4317 -4318  1052 -4321 0

c  0-1 --> -1
c    (-b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧ -p_1052) -> ( b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0)
c  in CNF:
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨  b^{1, 1053}_2
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_1
c     b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨  b^{1, 1053}_0
c  in DIMACS:
 4316  4317  4318  1052  4319 0
 4316  4317  4318  1052 -4320 0
 4316  4317  4318  1052  4321 0

c  -1-1 --> -2
c    ( b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧ -p_1052) -> ( b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0)
c  in CNF:
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨  b^{1, 1053}_2
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨  b^{1, 1053}_1
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨  p_1052 ∨ -b^{1, 1053}_0
c  in DIMACS:
-4316  4317 -4318  1052  4319 0
-4316  4317 -4318  1052  4320 0
-4316  4317 -4318  1052 -4321 0

c  -2-1 --> break 
c    ( b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧ -p_1052) -> break
c  in CNF:
c    -b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨  p_1052 ∨ break
c  in DIMACS:
-4316 -4317  4318  1052 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1052}_2 ∧ -b^{1, 1052}_1 ∧ -b^{1, 1052}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1052}_2 ∨  b^{1, 1052}_1 ∨  b^{1, 1052}_0 ∨ false 
c  in DIMACS:
-4316  4317  4318  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧ true) 
c  in CNF:
c     b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ false 
c  in DIMACS:
 4316 -4317 -4318  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1052}_2 ∧  b^{1, 1052}_1 ∧  b^{1, 1052}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1052}_2 ∨ -b^{1, 1052}_1 ∨ -b^{1, 1052}_0 ∨ false 
c  in DIMACS:
-4316 -4317 -4318  0

c i = 1053
c  -2+1 --> -1
c    ( b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧  p_1053) -> ( b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0)
c  in CNF:
c    -b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨  b^{1, 1054}_2
c    -b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_1
c    -b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨  b^{1, 1054}_0
c  in DIMACS:
-4319 -4320  4321 -1053  4322 0
-4319 -4320  4321 -1053 -4323 0
-4319 -4320  4321 -1053  4324 0

c  -1+1 --> 0
c    ( b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧  p_1053) -> (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧ -b^{1, 1054}_0)
c  in CNF:
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_2
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_1
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_0
c  in DIMACS:
-4319  4320 -4321 -1053 -4322 0
-4319  4320 -4321 -1053 -4323 0
-4319  4320 -4321 -1053 -4324 0

c  0+1 --> 1
c    (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧  p_1053) -> (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0)
c  in CNF:
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_2
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_1
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨  b^{1, 1054}_0
c  in DIMACS:
 4319  4320  4321 -1053 -4322 0
 4319  4320  4321 -1053 -4323 0
 4319  4320  4321 -1053  4324 0

c  1+1 --> 2
c    (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧  p_1053) -> (-b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0)
c  in CNF:
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_2
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨  b^{1, 1054}_1
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ -p_1053 ∨ -b^{1, 1054}_0
c  in DIMACS:
 4319  4320 -4321 -1053 -4322 0
 4319  4320 -4321 -1053  4323 0
 4319  4320 -4321 -1053 -4324 0

c  2+1 --> break 
c    (-b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 4319 -4320  4321 -1053 1162 0


c  2-1 --> 1
c    (-b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧ -p_1053) -> (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0)
c  in CNF:
c     b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_2
c     b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_1
c     b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨  b^{1, 1054}_0
c  in DIMACS:
 4319 -4320  4321  1053 -4322 0
 4319 -4320  4321  1053 -4323 0
 4319 -4320  4321  1053  4324 0

c  1-1 --> 0
c    (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧ -p_1053) -> (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧ -b^{1, 1054}_0)
c  in CNF:
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_2
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_1
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_0
c  in DIMACS:
 4319  4320 -4321  1053 -4322 0
 4319  4320 -4321  1053 -4323 0
 4319  4320 -4321  1053 -4324 0

c  0-1 --> -1
c    (-b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧ -p_1053) -> ( b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0)
c  in CNF:
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨  b^{1, 1054}_2
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_1
c     b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨  b^{1, 1054}_0
c  in DIMACS:
 4319  4320  4321  1053  4322 0
 4319  4320  4321  1053 -4323 0
 4319  4320  4321  1053  4324 0

c  -1-1 --> -2
c    ( b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧ -p_1053) -> ( b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0)
c  in CNF:
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨  b^{1, 1054}_2
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨  b^{1, 1054}_1
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨  p_1053 ∨ -b^{1, 1054}_0
c  in DIMACS:
-4319  4320 -4321  1053  4322 0
-4319  4320 -4321  1053  4323 0
-4319  4320 -4321  1053 -4324 0

c  -2-1 --> break 
c    ( b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-4319 -4320  4321  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1053}_2 ∧ -b^{1, 1053}_1 ∧ -b^{1, 1053}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1053}_2 ∨  b^{1, 1053}_1 ∨  b^{1, 1053}_0 ∨ false 
c  in DIMACS:
-4319  4320  4321  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧ true) 
c  in CNF:
c     b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ false 
c  in DIMACS:
 4319 -4320 -4321  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1053}_2 ∧  b^{1, 1053}_1 ∧  b^{1, 1053}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1053}_2 ∨ -b^{1, 1053}_1 ∨ -b^{1, 1053}_0 ∨ false 
c  in DIMACS:
-4319 -4320 -4321  0

c i = 1054
c  -2+1 --> -1
c    ( b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧  p_1054) -> ( b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0)
c  in CNF:
c    -b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨  b^{1, 1055}_2
c    -b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_1
c    -b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨  b^{1, 1055}_0
c  in DIMACS:
-4322 -4323  4324 -1054  4325 0
-4322 -4323  4324 -1054 -4326 0
-4322 -4323  4324 -1054  4327 0

c  -1+1 --> 0
c    ( b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧  p_1054) -> (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧ -b^{1, 1055}_0)
c  in CNF:
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_2
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_1
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_0
c  in DIMACS:
-4322  4323 -4324 -1054 -4325 0
-4322  4323 -4324 -1054 -4326 0
-4322  4323 -4324 -1054 -4327 0

c  0+1 --> 1
c    (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧  p_1054) -> (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0)
c  in CNF:
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_2
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_1
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨  b^{1, 1055}_0
c  in DIMACS:
 4322  4323  4324 -1054 -4325 0
 4322  4323  4324 -1054 -4326 0
 4322  4323  4324 -1054  4327 0

c  1+1 --> 2
c    (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧  p_1054) -> (-b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0)
c  in CNF:
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_2
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨  b^{1, 1055}_1
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ -p_1054 ∨ -b^{1, 1055}_0
c  in DIMACS:
 4322  4323 -4324 -1054 -4325 0
 4322  4323 -4324 -1054  4326 0
 4322  4323 -4324 -1054 -4327 0

c  2+1 --> break 
c    (-b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 4322 -4323  4324 -1054 1162 0


c  2-1 --> 1
c    (-b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧ -p_1054) -> (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0)
c  in CNF:
c     b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_2
c     b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_1
c     b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨  b^{1, 1055}_0
c  in DIMACS:
 4322 -4323  4324  1054 -4325 0
 4322 -4323  4324  1054 -4326 0
 4322 -4323  4324  1054  4327 0

c  1-1 --> 0
c    (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧ -p_1054) -> (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧ -b^{1, 1055}_0)
c  in CNF:
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_2
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_1
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_0
c  in DIMACS:
 4322  4323 -4324  1054 -4325 0
 4322  4323 -4324  1054 -4326 0
 4322  4323 -4324  1054 -4327 0

c  0-1 --> -1
c    (-b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧ -p_1054) -> ( b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0)
c  in CNF:
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨  b^{1, 1055}_2
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_1
c     b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨  b^{1, 1055}_0
c  in DIMACS:
 4322  4323  4324  1054  4325 0
 4322  4323  4324  1054 -4326 0
 4322  4323  4324  1054  4327 0

c  -1-1 --> -2
c    ( b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧ -p_1054) -> ( b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0)
c  in CNF:
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨  b^{1, 1055}_2
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨  b^{1, 1055}_1
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨  p_1054 ∨ -b^{1, 1055}_0
c  in DIMACS:
-4322  4323 -4324  1054  4325 0
-4322  4323 -4324  1054  4326 0
-4322  4323 -4324  1054 -4327 0

c  -2-1 --> break 
c    ( b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-4322 -4323  4324  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1054}_2 ∧ -b^{1, 1054}_1 ∧ -b^{1, 1054}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1054}_2 ∨  b^{1, 1054}_1 ∨  b^{1, 1054}_0 ∨ false 
c  in DIMACS:
-4322  4323  4324  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧ true) 
c  in CNF:
c     b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ false 
c  in DIMACS:
 4322 -4323 -4324  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1054}_2 ∧  b^{1, 1054}_1 ∧  b^{1, 1054}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1054}_2 ∨ -b^{1, 1054}_1 ∨ -b^{1, 1054}_0 ∨ false 
c  in DIMACS:
-4322 -4323 -4324  0

c i = 1055
c  -2+1 --> -1
c    ( b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧  p_1055) -> ( b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0)
c  in CNF:
c    -b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨  b^{1, 1056}_2
c    -b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_1
c    -b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨  b^{1, 1056}_0
c  in DIMACS:
-4325 -4326  4327 -1055  4328 0
-4325 -4326  4327 -1055 -4329 0
-4325 -4326  4327 -1055  4330 0

c  -1+1 --> 0
c    ( b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧  p_1055) -> (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧ -b^{1, 1056}_0)
c  in CNF:
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_2
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_1
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_0
c  in DIMACS:
-4325  4326 -4327 -1055 -4328 0
-4325  4326 -4327 -1055 -4329 0
-4325  4326 -4327 -1055 -4330 0

c  0+1 --> 1
c    (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧  p_1055) -> (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0)
c  in CNF:
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_2
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_1
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨  b^{1, 1056}_0
c  in DIMACS:
 4325  4326  4327 -1055 -4328 0
 4325  4326  4327 -1055 -4329 0
 4325  4326  4327 -1055  4330 0

c  1+1 --> 2
c    (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧  p_1055) -> (-b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0)
c  in CNF:
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_2
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨  b^{1, 1056}_1
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ -p_1055 ∨ -b^{1, 1056}_0
c  in DIMACS:
 4325  4326 -4327 -1055 -4328 0
 4325  4326 -4327 -1055  4329 0
 4325  4326 -4327 -1055 -4330 0

c  2+1 --> break 
c    (-b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧  p_1055) -> break
c  in CNF:
c     b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ -p_1055 ∨ break
c  in DIMACS:
 4325 -4326  4327 -1055 1162 0


c  2-1 --> 1
c    (-b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧ -p_1055) -> (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0)
c  in CNF:
c     b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_2
c     b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_1
c     b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨  b^{1, 1056}_0
c  in DIMACS:
 4325 -4326  4327  1055 -4328 0
 4325 -4326  4327  1055 -4329 0
 4325 -4326  4327  1055  4330 0

c  1-1 --> 0
c    (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧ -p_1055) -> (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧ -b^{1, 1056}_0)
c  in CNF:
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_2
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_1
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_0
c  in DIMACS:
 4325  4326 -4327  1055 -4328 0
 4325  4326 -4327  1055 -4329 0
 4325  4326 -4327  1055 -4330 0

c  0-1 --> -1
c    (-b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧ -p_1055) -> ( b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0)
c  in CNF:
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨  b^{1, 1056}_2
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_1
c     b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨  b^{1, 1056}_0
c  in DIMACS:
 4325  4326  4327  1055  4328 0
 4325  4326  4327  1055 -4329 0
 4325  4326  4327  1055  4330 0

c  -1-1 --> -2
c    ( b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧ -p_1055) -> ( b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0)
c  in CNF:
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨  b^{1, 1056}_2
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨  b^{1, 1056}_1
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨  p_1055 ∨ -b^{1, 1056}_0
c  in DIMACS:
-4325  4326 -4327  1055  4328 0
-4325  4326 -4327  1055  4329 0
-4325  4326 -4327  1055 -4330 0

c  -2-1 --> break 
c    ( b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧ -p_1055) -> break
c  in CNF:
c    -b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨  p_1055 ∨ break
c  in DIMACS:
-4325 -4326  4327  1055 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1055}_2 ∧ -b^{1, 1055}_1 ∧ -b^{1, 1055}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1055}_2 ∨  b^{1, 1055}_1 ∨  b^{1, 1055}_0 ∨ false 
c  in DIMACS:
-4325  4326  4327  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧ true) 
c  in CNF:
c     b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ false 
c  in DIMACS:
 4325 -4326 -4327  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1055}_2 ∧  b^{1, 1055}_1 ∧  b^{1, 1055}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1055}_2 ∨ -b^{1, 1055}_1 ∨ -b^{1, 1055}_0 ∨ false 
c  in DIMACS:
-4325 -4326 -4327  0

c i = 1056
c  -2+1 --> -1
c    ( b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧  p_1056) -> ( b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0)
c  in CNF:
c    -b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨  b^{1, 1057}_2
c    -b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_1
c    -b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨  b^{1, 1057}_0
c  in DIMACS:
-4328 -4329  4330 -1056  4331 0
-4328 -4329  4330 -1056 -4332 0
-4328 -4329  4330 -1056  4333 0

c  -1+1 --> 0
c    ( b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧  p_1056) -> (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧ -b^{1, 1057}_0)
c  in CNF:
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_2
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_1
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_0
c  in DIMACS:
-4328  4329 -4330 -1056 -4331 0
-4328  4329 -4330 -1056 -4332 0
-4328  4329 -4330 -1056 -4333 0

c  0+1 --> 1
c    (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧  p_1056) -> (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0)
c  in CNF:
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_2
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_1
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨  b^{1, 1057}_0
c  in DIMACS:
 4328  4329  4330 -1056 -4331 0
 4328  4329  4330 -1056 -4332 0
 4328  4329  4330 -1056  4333 0

c  1+1 --> 2
c    (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧  p_1056) -> (-b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0)
c  in CNF:
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_2
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨  b^{1, 1057}_1
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ -p_1056 ∨ -b^{1, 1057}_0
c  in DIMACS:
 4328  4329 -4330 -1056 -4331 0
 4328  4329 -4330 -1056  4332 0
 4328  4329 -4330 -1056 -4333 0

c  2+1 --> break 
c    (-b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 4328 -4329  4330 -1056 1162 0


c  2-1 --> 1
c    (-b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧ -p_1056) -> (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0)
c  in CNF:
c     b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_2
c     b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_1
c     b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨  b^{1, 1057}_0
c  in DIMACS:
 4328 -4329  4330  1056 -4331 0
 4328 -4329  4330  1056 -4332 0
 4328 -4329  4330  1056  4333 0

c  1-1 --> 0
c    (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧ -p_1056) -> (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧ -b^{1, 1057}_0)
c  in CNF:
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_2
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_1
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_0
c  in DIMACS:
 4328  4329 -4330  1056 -4331 0
 4328  4329 -4330  1056 -4332 0
 4328  4329 -4330  1056 -4333 0

c  0-1 --> -1
c    (-b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧ -p_1056) -> ( b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0)
c  in CNF:
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨  b^{1, 1057}_2
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_1
c     b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨  b^{1, 1057}_0
c  in DIMACS:
 4328  4329  4330  1056  4331 0
 4328  4329  4330  1056 -4332 0
 4328  4329  4330  1056  4333 0

c  -1-1 --> -2
c    ( b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧ -p_1056) -> ( b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0)
c  in CNF:
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨  b^{1, 1057}_2
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨  b^{1, 1057}_1
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨  p_1056 ∨ -b^{1, 1057}_0
c  in DIMACS:
-4328  4329 -4330  1056  4331 0
-4328  4329 -4330  1056  4332 0
-4328  4329 -4330  1056 -4333 0

c  -2-1 --> break 
c    ( b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-4328 -4329  4330  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1056}_2 ∧ -b^{1, 1056}_1 ∧ -b^{1, 1056}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1056}_2 ∨  b^{1, 1056}_1 ∨  b^{1, 1056}_0 ∨ false 
c  in DIMACS:
-4328  4329  4330  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧ true) 
c  in CNF:
c     b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ false 
c  in DIMACS:
 4328 -4329 -4330  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1056}_2 ∧  b^{1, 1056}_1 ∧  b^{1, 1056}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1056}_2 ∨ -b^{1, 1056}_1 ∨ -b^{1, 1056}_0 ∨ false 
c  in DIMACS:
-4328 -4329 -4330  0

c i = 1057
c  -2+1 --> -1
c    ( b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧  p_1057) -> ( b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0)
c  in CNF:
c    -b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨  b^{1, 1058}_2
c    -b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_1
c    -b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨  b^{1, 1058}_0
c  in DIMACS:
-4331 -4332  4333 -1057  4334 0
-4331 -4332  4333 -1057 -4335 0
-4331 -4332  4333 -1057  4336 0

c  -1+1 --> 0
c    ( b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧  p_1057) -> (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧ -b^{1, 1058}_0)
c  in CNF:
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_2
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_1
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_0
c  in DIMACS:
-4331  4332 -4333 -1057 -4334 0
-4331  4332 -4333 -1057 -4335 0
-4331  4332 -4333 -1057 -4336 0

c  0+1 --> 1
c    (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧  p_1057) -> (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0)
c  in CNF:
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_2
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_1
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨  b^{1, 1058}_0
c  in DIMACS:
 4331  4332  4333 -1057 -4334 0
 4331  4332  4333 -1057 -4335 0
 4331  4332  4333 -1057  4336 0

c  1+1 --> 2
c    (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧  p_1057) -> (-b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0)
c  in CNF:
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_2
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨  b^{1, 1058}_1
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ -p_1057 ∨ -b^{1, 1058}_0
c  in DIMACS:
 4331  4332 -4333 -1057 -4334 0
 4331  4332 -4333 -1057  4335 0
 4331  4332 -4333 -1057 -4336 0

c  2+1 --> break 
c    (-b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧  p_1057) -> break
c  in CNF:
c     b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ -p_1057 ∨ break
c  in DIMACS:
 4331 -4332  4333 -1057 1162 0


c  2-1 --> 1
c    (-b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧ -p_1057) -> (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0)
c  in CNF:
c     b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_2
c     b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_1
c     b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨  b^{1, 1058}_0
c  in DIMACS:
 4331 -4332  4333  1057 -4334 0
 4331 -4332  4333  1057 -4335 0
 4331 -4332  4333  1057  4336 0

c  1-1 --> 0
c    (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧ -p_1057) -> (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧ -b^{1, 1058}_0)
c  in CNF:
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_2
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_1
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_0
c  in DIMACS:
 4331  4332 -4333  1057 -4334 0
 4331  4332 -4333  1057 -4335 0
 4331  4332 -4333  1057 -4336 0

c  0-1 --> -1
c    (-b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧ -p_1057) -> ( b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0)
c  in CNF:
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨  b^{1, 1058}_2
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_1
c     b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨  b^{1, 1058}_0
c  in DIMACS:
 4331  4332  4333  1057  4334 0
 4331  4332  4333  1057 -4335 0
 4331  4332  4333  1057  4336 0

c  -1-1 --> -2
c    ( b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧ -p_1057) -> ( b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0)
c  in CNF:
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨  b^{1, 1058}_2
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨  b^{1, 1058}_1
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨  p_1057 ∨ -b^{1, 1058}_0
c  in DIMACS:
-4331  4332 -4333  1057  4334 0
-4331  4332 -4333  1057  4335 0
-4331  4332 -4333  1057 -4336 0

c  -2-1 --> break 
c    ( b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧ -p_1057) -> break
c  in CNF:
c    -b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨  p_1057 ∨ break
c  in DIMACS:
-4331 -4332  4333  1057 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1057}_2 ∧ -b^{1, 1057}_1 ∧ -b^{1, 1057}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1057}_2 ∨  b^{1, 1057}_1 ∨  b^{1, 1057}_0 ∨ false 
c  in DIMACS:
-4331  4332  4333  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧ true) 
c  in CNF:
c     b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ false 
c  in DIMACS:
 4331 -4332 -4333  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1057}_2 ∧  b^{1, 1057}_1 ∧  b^{1, 1057}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1057}_2 ∨ -b^{1, 1057}_1 ∨ -b^{1, 1057}_0 ∨ false 
c  in DIMACS:
-4331 -4332 -4333  0

c i = 1058
c  -2+1 --> -1
c    ( b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧  p_1058) -> ( b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0)
c  in CNF:
c    -b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨  b^{1, 1059}_2
c    -b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_1
c    -b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨  b^{1, 1059}_0
c  in DIMACS:
-4334 -4335  4336 -1058  4337 0
-4334 -4335  4336 -1058 -4338 0
-4334 -4335  4336 -1058  4339 0

c  -1+1 --> 0
c    ( b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧  p_1058) -> (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧ -b^{1, 1059}_0)
c  in CNF:
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_2
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_1
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_0
c  in DIMACS:
-4334  4335 -4336 -1058 -4337 0
-4334  4335 -4336 -1058 -4338 0
-4334  4335 -4336 -1058 -4339 0

c  0+1 --> 1
c    (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧  p_1058) -> (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0)
c  in CNF:
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_2
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_1
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨  b^{1, 1059}_0
c  in DIMACS:
 4334  4335  4336 -1058 -4337 0
 4334  4335  4336 -1058 -4338 0
 4334  4335  4336 -1058  4339 0

c  1+1 --> 2
c    (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧  p_1058) -> (-b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0)
c  in CNF:
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_2
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨  b^{1, 1059}_1
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ -p_1058 ∨ -b^{1, 1059}_0
c  in DIMACS:
 4334  4335 -4336 -1058 -4337 0
 4334  4335 -4336 -1058  4338 0
 4334  4335 -4336 -1058 -4339 0

c  2+1 --> break 
c    (-b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧  p_1058) -> break
c  in CNF:
c     b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ -p_1058 ∨ break
c  in DIMACS:
 4334 -4335  4336 -1058 1162 0


c  2-1 --> 1
c    (-b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧ -p_1058) -> (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0)
c  in CNF:
c     b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_2
c     b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_1
c     b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨  b^{1, 1059}_0
c  in DIMACS:
 4334 -4335  4336  1058 -4337 0
 4334 -4335  4336  1058 -4338 0
 4334 -4335  4336  1058  4339 0

c  1-1 --> 0
c    (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧ -p_1058) -> (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧ -b^{1, 1059}_0)
c  in CNF:
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_2
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_1
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_0
c  in DIMACS:
 4334  4335 -4336  1058 -4337 0
 4334  4335 -4336  1058 -4338 0
 4334  4335 -4336  1058 -4339 0

c  0-1 --> -1
c    (-b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧ -p_1058) -> ( b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0)
c  in CNF:
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨  b^{1, 1059}_2
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_1
c     b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨  b^{1, 1059}_0
c  in DIMACS:
 4334  4335  4336  1058  4337 0
 4334  4335  4336  1058 -4338 0
 4334  4335  4336  1058  4339 0

c  -1-1 --> -2
c    ( b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧ -p_1058) -> ( b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0)
c  in CNF:
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨  b^{1, 1059}_2
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨  b^{1, 1059}_1
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨  p_1058 ∨ -b^{1, 1059}_0
c  in DIMACS:
-4334  4335 -4336  1058  4337 0
-4334  4335 -4336  1058  4338 0
-4334  4335 -4336  1058 -4339 0

c  -2-1 --> break 
c    ( b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧ -p_1058) -> break
c  in CNF:
c    -b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨  p_1058 ∨ break
c  in DIMACS:
-4334 -4335  4336  1058 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1058}_2 ∧ -b^{1, 1058}_1 ∧ -b^{1, 1058}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1058}_2 ∨  b^{1, 1058}_1 ∨  b^{1, 1058}_0 ∨ false 
c  in DIMACS:
-4334  4335  4336  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧ true) 
c  in CNF:
c     b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ false 
c  in DIMACS:
 4334 -4335 -4336  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1058}_2 ∧  b^{1, 1058}_1 ∧  b^{1, 1058}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1058}_2 ∨ -b^{1, 1058}_1 ∨ -b^{1, 1058}_0 ∨ false 
c  in DIMACS:
-4334 -4335 -4336  0

c i = 1059
c  -2+1 --> -1
c    ( b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧  p_1059) -> ( b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0)
c  in CNF:
c    -b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨  b^{1, 1060}_2
c    -b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_1
c    -b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨  b^{1, 1060}_0
c  in DIMACS:
-4337 -4338  4339 -1059  4340 0
-4337 -4338  4339 -1059 -4341 0
-4337 -4338  4339 -1059  4342 0

c  -1+1 --> 0
c    ( b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧  p_1059) -> (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧ -b^{1, 1060}_0)
c  in CNF:
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_2
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_1
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_0
c  in DIMACS:
-4337  4338 -4339 -1059 -4340 0
-4337  4338 -4339 -1059 -4341 0
-4337  4338 -4339 -1059 -4342 0

c  0+1 --> 1
c    (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧  p_1059) -> (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0)
c  in CNF:
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_2
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_1
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨  b^{1, 1060}_0
c  in DIMACS:
 4337  4338  4339 -1059 -4340 0
 4337  4338  4339 -1059 -4341 0
 4337  4338  4339 -1059  4342 0

c  1+1 --> 2
c    (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧  p_1059) -> (-b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0)
c  in CNF:
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_2
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨  b^{1, 1060}_1
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ -p_1059 ∨ -b^{1, 1060}_0
c  in DIMACS:
 4337  4338 -4339 -1059 -4340 0
 4337  4338 -4339 -1059  4341 0
 4337  4338 -4339 -1059 -4342 0

c  2+1 --> break 
c    (-b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧  p_1059) -> break
c  in CNF:
c     b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ -p_1059 ∨ break
c  in DIMACS:
 4337 -4338  4339 -1059 1162 0


c  2-1 --> 1
c    (-b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧ -p_1059) -> (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0)
c  in CNF:
c     b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_2
c     b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_1
c     b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨  b^{1, 1060}_0
c  in DIMACS:
 4337 -4338  4339  1059 -4340 0
 4337 -4338  4339  1059 -4341 0
 4337 -4338  4339  1059  4342 0

c  1-1 --> 0
c    (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧ -p_1059) -> (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧ -b^{1, 1060}_0)
c  in CNF:
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_2
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_1
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_0
c  in DIMACS:
 4337  4338 -4339  1059 -4340 0
 4337  4338 -4339  1059 -4341 0
 4337  4338 -4339  1059 -4342 0

c  0-1 --> -1
c    (-b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧ -p_1059) -> ( b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0)
c  in CNF:
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨  b^{1, 1060}_2
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_1
c     b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨  b^{1, 1060}_0
c  in DIMACS:
 4337  4338  4339  1059  4340 0
 4337  4338  4339  1059 -4341 0
 4337  4338  4339  1059  4342 0

c  -1-1 --> -2
c    ( b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧ -p_1059) -> ( b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0)
c  in CNF:
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨  b^{1, 1060}_2
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨  b^{1, 1060}_1
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨  p_1059 ∨ -b^{1, 1060}_0
c  in DIMACS:
-4337  4338 -4339  1059  4340 0
-4337  4338 -4339  1059  4341 0
-4337  4338 -4339  1059 -4342 0

c  -2-1 --> break 
c    ( b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧ -p_1059) -> break
c  in CNF:
c    -b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨  p_1059 ∨ break
c  in DIMACS:
-4337 -4338  4339  1059 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1059}_2 ∧ -b^{1, 1059}_1 ∧ -b^{1, 1059}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1059}_2 ∨  b^{1, 1059}_1 ∨  b^{1, 1059}_0 ∨ false 
c  in DIMACS:
-4337  4338  4339  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧ true) 
c  in CNF:
c     b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ false 
c  in DIMACS:
 4337 -4338 -4339  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1059}_2 ∧  b^{1, 1059}_1 ∧  b^{1, 1059}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1059}_2 ∨ -b^{1, 1059}_1 ∨ -b^{1, 1059}_0 ∨ false 
c  in DIMACS:
-4337 -4338 -4339  0

c i = 1060
c  -2+1 --> -1
c    ( b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧  p_1060) -> ( b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0)
c  in CNF:
c    -b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨  b^{1, 1061}_2
c    -b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_1
c    -b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨  b^{1, 1061}_0
c  in DIMACS:
-4340 -4341  4342 -1060  4343 0
-4340 -4341  4342 -1060 -4344 0
-4340 -4341  4342 -1060  4345 0

c  -1+1 --> 0
c    ( b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧  p_1060) -> (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧ -b^{1, 1061}_0)
c  in CNF:
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_2
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_1
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_0
c  in DIMACS:
-4340  4341 -4342 -1060 -4343 0
-4340  4341 -4342 -1060 -4344 0
-4340  4341 -4342 -1060 -4345 0

c  0+1 --> 1
c    (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧  p_1060) -> (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0)
c  in CNF:
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_2
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_1
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨  b^{1, 1061}_0
c  in DIMACS:
 4340  4341  4342 -1060 -4343 0
 4340  4341  4342 -1060 -4344 0
 4340  4341  4342 -1060  4345 0

c  1+1 --> 2
c    (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧  p_1060) -> (-b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0)
c  in CNF:
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_2
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨  b^{1, 1061}_1
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ -p_1060 ∨ -b^{1, 1061}_0
c  in DIMACS:
 4340  4341 -4342 -1060 -4343 0
 4340  4341 -4342 -1060  4344 0
 4340  4341 -4342 -1060 -4345 0

c  2+1 --> break 
c    (-b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 4340 -4341  4342 -1060 1162 0


c  2-1 --> 1
c    (-b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧ -p_1060) -> (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0)
c  in CNF:
c     b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_2
c     b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_1
c     b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨  b^{1, 1061}_0
c  in DIMACS:
 4340 -4341  4342  1060 -4343 0
 4340 -4341  4342  1060 -4344 0
 4340 -4341  4342  1060  4345 0

c  1-1 --> 0
c    (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧ -p_1060) -> (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧ -b^{1, 1061}_0)
c  in CNF:
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_2
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_1
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_0
c  in DIMACS:
 4340  4341 -4342  1060 -4343 0
 4340  4341 -4342  1060 -4344 0
 4340  4341 -4342  1060 -4345 0

c  0-1 --> -1
c    (-b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧ -p_1060) -> ( b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0)
c  in CNF:
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨  b^{1, 1061}_2
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_1
c     b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨  b^{1, 1061}_0
c  in DIMACS:
 4340  4341  4342  1060  4343 0
 4340  4341  4342  1060 -4344 0
 4340  4341  4342  1060  4345 0

c  -1-1 --> -2
c    ( b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧ -p_1060) -> ( b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0)
c  in CNF:
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨  b^{1, 1061}_2
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨  b^{1, 1061}_1
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨  p_1060 ∨ -b^{1, 1061}_0
c  in DIMACS:
-4340  4341 -4342  1060  4343 0
-4340  4341 -4342  1060  4344 0
-4340  4341 -4342  1060 -4345 0

c  -2-1 --> break 
c    ( b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-4340 -4341  4342  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1060}_2 ∧ -b^{1, 1060}_1 ∧ -b^{1, 1060}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1060}_2 ∨  b^{1, 1060}_1 ∨  b^{1, 1060}_0 ∨ false 
c  in DIMACS:
-4340  4341  4342  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧ true) 
c  in CNF:
c     b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ false 
c  in DIMACS:
 4340 -4341 -4342  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1060}_2 ∧  b^{1, 1060}_1 ∧  b^{1, 1060}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1060}_2 ∨ -b^{1, 1060}_1 ∨ -b^{1, 1060}_0 ∨ false 
c  in DIMACS:
-4340 -4341 -4342  0

c i = 1061
c  -2+1 --> -1
c    ( b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧  p_1061) -> ( b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0)
c  in CNF:
c    -b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨  b^{1, 1062}_2
c    -b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_1
c    -b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨  b^{1, 1062}_0
c  in DIMACS:
-4343 -4344  4345 -1061  4346 0
-4343 -4344  4345 -1061 -4347 0
-4343 -4344  4345 -1061  4348 0

c  -1+1 --> 0
c    ( b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧  p_1061) -> (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧ -b^{1, 1062}_0)
c  in CNF:
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_2
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_1
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_0
c  in DIMACS:
-4343  4344 -4345 -1061 -4346 0
-4343  4344 -4345 -1061 -4347 0
-4343  4344 -4345 -1061 -4348 0

c  0+1 --> 1
c    (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧  p_1061) -> (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0)
c  in CNF:
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_2
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_1
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨  b^{1, 1062}_0
c  in DIMACS:
 4343  4344  4345 -1061 -4346 0
 4343  4344  4345 -1061 -4347 0
 4343  4344  4345 -1061  4348 0

c  1+1 --> 2
c    (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧  p_1061) -> (-b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0)
c  in CNF:
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_2
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨  b^{1, 1062}_1
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ -p_1061 ∨ -b^{1, 1062}_0
c  in DIMACS:
 4343  4344 -4345 -1061 -4346 0
 4343  4344 -4345 -1061  4347 0
 4343  4344 -4345 -1061 -4348 0

c  2+1 --> break 
c    (-b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧  p_1061) -> break
c  in CNF:
c     b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ -p_1061 ∨ break
c  in DIMACS:
 4343 -4344  4345 -1061 1162 0


c  2-1 --> 1
c    (-b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧ -p_1061) -> (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0)
c  in CNF:
c     b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_2
c     b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_1
c     b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨  b^{1, 1062}_0
c  in DIMACS:
 4343 -4344  4345  1061 -4346 0
 4343 -4344  4345  1061 -4347 0
 4343 -4344  4345  1061  4348 0

c  1-1 --> 0
c    (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧ -p_1061) -> (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧ -b^{1, 1062}_0)
c  in CNF:
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_2
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_1
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_0
c  in DIMACS:
 4343  4344 -4345  1061 -4346 0
 4343  4344 -4345  1061 -4347 0
 4343  4344 -4345  1061 -4348 0

c  0-1 --> -1
c    (-b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧ -p_1061) -> ( b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0)
c  in CNF:
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨  b^{1, 1062}_2
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_1
c     b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨  b^{1, 1062}_0
c  in DIMACS:
 4343  4344  4345  1061  4346 0
 4343  4344  4345  1061 -4347 0
 4343  4344  4345  1061  4348 0

c  -1-1 --> -2
c    ( b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧ -p_1061) -> ( b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0)
c  in CNF:
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨  b^{1, 1062}_2
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨  b^{1, 1062}_1
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨  p_1061 ∨ -b^{1, 1062}_0
c  in DIMACS:
-4343  4344 -4345  1061  4346 0
-4343  4344 -4345  1061  4347 0
-4343  4344 -4345  1061 -4348 0

c  -2-1 --> break 
c    ( b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧ -p_1061) -> break
c  in CNF:
c    -b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨  p_1061 ∨ break
c  in DIMACS:
-4343 -4344  4345  1061 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1061}_2 ∧ -b^{1, 1061}_1 ∧ -b^{1, 1061}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1061}_2 ∨  b^{1, 1061}_1 ∨  b^{1, 1061}_0 ∨ false 
c  in DIMACS:
-4343  4344  4345  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧ true) 
c  in CNF:
c     b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ false 
c  in DIMACS:
 4343 -4344 -4345  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1061}_2 ∧  b^{1, 1061}_1 ∧  b^{1, 1061}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1061}_2 ∨ -b^{1, 1061}_1 ∨ -b^{1, 1061}_0 ∨ false 
c  in DIMACS:
-4343 -4344 -4345  0

c i = 1062
c  -2+1 --> -1
c    ( b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧  p_1062) -> ( b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0)
c  in CNF:
c    -b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨  b^{1, 1063}_2
c    -b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_1
c    -b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨  b^{1, 1063}_0
c  in DIMACS:
-4346 -4347  4348 -1062  4349 0
-4346 -4347  4348 -1062 -4350 0
-4346 -4347  4348 -1062  4351 0

c  -1+1 --> 0
c    ( b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧  p_1062) -> (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧ -b^{1, 1063}_0)
c  in CNF:
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_2
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_1
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_0
c  in DIMACS:
-4346  4347 -4348 -1062 -4349 0
-4346  4347 -4348 -1062 -4350 0
-4346  4347 -4348 -1062 -4351 0

c  0+1 --> 1
c    (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧  p_1062) -> (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0)
c  in CNF:
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_2
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_1
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨  b^{1, 1063}_0
c  in DIMACS:
 4346  4347  4348 -1062 -4349 0
 4346  4347  4348 -1062 -4350 0
 4346  4347  4348 -1062  4351 0

c  1+1 --> 2
c    (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧  p_1062) -> (-b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0)
c  in CNF:
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_2
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨  b^{1, 1063}_1
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ -p_1062 ∨ -b^{1, 1063}_0
c  in DIMACS:
 4346  4347 -4348 -1062 -4349 0
 4346  4347 -4348 -1062  4350 0
 4346  4347 -4348 -1062 -4351 0

c  2+1 --> break 
c    (-b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 4346 -4347  4348 -1062 1162 0


c  2-1 --> 1
c    (-b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧ -p_1062) -> (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0)
c  in CNF:
c     b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_2
c     b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_1
c     b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨  b^{1, 1063}_0
c  in DIMACS:
 4346 -4347  4348  1062 -4349 0
 4346 -4347  4348  1062 -4350 0
 4346 -4347  4348  1062  4351 0

c  1-1 --> 0
c    (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧ -p_1062) -> (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧ -b^{1, 1063}_0)
c  in CNF:
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_2
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_1
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_0
c  in DIMACS:
 4346  4347 -4348  1062 -4349 0
 4346  4347 -4348  1062 -4350 0
 4346  4347 -4348  1062 -4351 0

c  0-1 --> -1
c    (-b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧ -p_1062) -> ( b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0)
c  in CNF:
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨  b^{1, 1063}_2
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_1
c     b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨  b^{1, 1063}_0
c  in DIMACS:
 4346  4347  4348  1062  4349 0
 4346  4347  4348  1062 -4350 0
 4346  4347  4348  1062  4351 0

c  -1-1 --> -2
c    ( b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧ -p_1062) -> ( b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0)
c  in CNF:
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨  b^{1, 1063}_2
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨  b^{1, 1063}_1
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨  p_1062 ∨ -b^{1, 1063}_0
c  in DIMACS:
-4346  4347 -4348  1062  4349 0
-4346  4347 -4348  1062  4350 0
-4346  4347 -4348  1062 -4351 0

c  -2-1 --> break 
c    ( b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-4346 -4347  4348  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1062}_2 ∧ -b^{1, 1062}_1 ∧ -b^{1, 1062}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1062}_2 ∨  b^{1, 1062}_1 ∨  b^{1, 1062}_0 ∨ false 
c  in DIMACS:
-4346  4347  4348  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧ true) 
c  in CNF:
c     b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ false 
c  in DIMACS:
 4346 -4347 -4348  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1062}_2 ∧  b^{1, 1062}_1 ∧  b^{1, 1062}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1062}_2 ∨ -b^{1, 1062}_1 ∨ -b^{1, 1062}_0 ∨ false 
c  in DIMACS:
-4346 -4347 -4348  0

c i = 1063
c  -2+1 --> -1
c    ( b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧  p_1063) -> ( b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0)
c  in CNF:
c    -b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨  b^{1, 1064}_2
c    -b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_1
c    -b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨  b^{1, 1064}_0
c  in DIMACS:
-4349 -4350  4351 -1063  4352 0
-4349 -4350  4351 -1063 -4353 0
-4349 -4350  4351 -1063  4354 0

c  -1+1 --> 0
c    ( b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧  p_1063) -> (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧ -b^{1, 1064}_0)
c  in CNF:
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_2
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_1
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_0
c  in DIMACS:
-4349  4350 -4351 -1063 -4352 0
-4349  4350 -4351 -1063 -4353 0
-4349  4350 -4351 -1063 -4354 0

c  0+1 --> 1
c    (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧  p_1063) -> (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0)
c  in CNF:
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_2
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_1
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨  b^{1, 1064}_0
c  in DIMACS:
 4349  4350  4351 -1063 -4352 0
 4349  4350  4351 -1063 -4353 0
 4349  4350  4351 -1063  4354 0

c  1+1 --> 2
c    (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧  p_1063) -> (-b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0)
c  in CNF:
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_2
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨  b^{1, 1064}_1
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ -p_1063 ∨ -b^{1, 1064}_0
c  in DIMACS:
 4349  4350 -4351 -1063 -4352 0
 4349  4350 -4351 -1063  4353 0
 4349  4350 -4351 -1063 -4354 0

c  2+1 --> break 
c    (-b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧  p_1063) -> break
c  in CNF:
c     b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ -p_1063 ∨ break
c  in DIMACS:
 4349 -4350  4351 -1063 1162 0


c  2-1 --> 1
c    (-b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧ -p_1063) -> (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0)
c  in CNF:
c     b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_2
c     b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_1
c     b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨  b^{1, 1064}_0
c  in DIMACS:
 4349 -4350  4351  1063 -4352 0
 4349 -4350  4351  1063 -4353 0
 4349 -4350  4351  1063  4354 0

c  1-1 --> 0
c    (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧ -p_1063) -> (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧ -b^{1, 1064}_0)
c  in CNF:
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_2
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_1
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_0
c  in DIMACS:
 4349  4350 -4351  1063 -4352 0
 4349  4350 -4351  1063 -4353 0
 4349  4350 -4351  1063 -4354 0

c  0-1 --> -1
c    (-b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧ -p_1063) -> ( b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0)
c  in CNF:
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨  b^{1, 1064}_2
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_1
c     b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨  b^{1, 1064}_0
c  in DIMACS:
 4349  4350  4351  1063  4352 0
 4349  4350  4351  1063 -4353 0
 4349  4350  4351  1063  4354 0

c  -1-1 --> -2
c    ( b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧ -p_1063) -> ( b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0)
c  in CNF:
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨  b^{1, 1064}_2
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨  b^{1, 1064}_1
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨  p_1063 ∨ -b^{1, 1064}_0
c  in DIMACS:
-4349  4350 -4351  1063  4352 0
-4349  4350 -4351  1063  4353 0
-4349  4350 -4351  1063 -4354 0

c  -2-1 --> break 
c    ( b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧ -p_1063) -> break
c  in CNF:
c    -b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨  p_1063 ∨ break
c  in DIMACS:
-4349 -4350  4351  1063 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1063}_2 ∧ -b^{1, 1063}_1 ∧ -b^{1, 1063}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1063}_2 ∨  b^{1, 1063}_1 ∨  b^{1, 1063}_0 ∨ false 
c  in DIMACS:
-4349  4350  4351  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧ true) 
c  in CNF:
c     b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ false 
c  in DIMACS:
 4349 -4350 -4351  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1063}_2 ∧  b^{1, 1063}_1 ∧  b^{1, 1063}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1063}_2 ∨ -b^{1, 1063}_1 ∨ -b^{1, 1063}_0 ∨ false 
c  in DIMACS:
-4349 -4350 -4351  0

c i = 1064
c  -2+1 --> -1
c    ( b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧  p_1064) -> ( b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0)
c  in CNF:
c    -b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨  b^{1, 1065}_2
c    -b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_1
c    -b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨  b^{1, 1065}_0
c  in DIMACS:
-4352 -4353  4354 -1064  4355 0
-4352 -4353  4354 -1064 -4356 0
-4352 -4353  4354 -1064  4357 0

c  -1+1 --> 0
c    ( b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧  p_1064) -> (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧ -b^{1, 1065}_0)
c  in CNF:
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_2
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_1
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_0
c  in DIMACS:
-4352  4353 -4354 -1064 -4355 0
-4352  4353 -4354 -1064 -4356 0
-4352  4353 -4354 -1064 -4357 0

c  0+1 --> 1
c    (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧  p_1064) -> (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0)
c  in CNF:
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_2
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_1
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨  b^{1, 1065}_0
c  in DIMACS:
 4352  4353  4354 -1064 -4355 0
 4352  4353  4354 -1064 -4356 0
 4352  4353  4354 -1064  4357 0

c  1+1 --> 2
c    (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧  p_1064) -> (-b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0)
c  in CNF:
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_2
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨  b^{1, 1065}_1
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ -p_1064 ∨ -b^{1, 1065}_0
c  in DIMACS:
 4352  4353 -4354 -1064 -4355 0
 4352  4353 -4354 -1064  4356 0
 4352  4353 -4354 -1064 -4357 0

c  2+1 --> break 
c    (-b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 4352 -4353  4354 -1064 1162 0


c  2-1 --> 1
c    (-b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧ -p_1064) -> (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0)
c  in CNF:
c     b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_2
c     b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_1
c     b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨  b^{1, 1065}_0
c  in DIMACS:
 4352 -4353  4354  1064 -4355 0
 4352 -4353  4354  1064 -4356 0
 4352 -4353  4354  1064  4357 0

c  1-1 --> 0
c    (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧ -p_1064) -> (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧ -b^{1, 1065}_0)
c  in CNF:
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_2
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_1
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_0
c  in DIMACS:
 4352  4353 -4354  1064 -4355 0
 4352  4353 -4354  1064 -4356 0
 4352  4353 -4354  1064 -4357 0

c  0-1 --> -1
c    (-b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧ -p_1064) -> ( b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0)
c  in CNF:
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨  b^{1, 1065}_2
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_1
c     b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨  b^{1, 1065}_0
c  in DIMACS:
 4352  4353  4354  1064  4355 0
 4352  4353  4354  1064 -4356 0
 4352  4353  4354  1064  4357 0

c  -1-1 --> -2
c    ( b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧ -p_1064) -> ( b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0)
c  in CNF:
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨  b^{1, 1065}_2
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨  b^{1, 1065}_1
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨  p_1064 ∨ -b^{1, 1065}_0
c  in DIMACS:
-4352  4353 -4354  1064  4355 0
-4352  4353 -4354  1064  4356 0
-4352  4353 -4354  1064 -4357 0

c  -2-1 --> break 
c    ( b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-4352 -4353  4354  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1064}_2 ∧ -b^{1, 1064}_1 ∧ -b^{1, 1064}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1064}_2 ∨  b^{1, 1064}_1 ∨  b^{1, 1064}_0 ∨ false 
c  in DIMACS:
-4352  4353  4354  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧ true) 
c  in CNF:
c     b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ false 
c  in DIMACS:
 4352 -4353 -4354  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1064}_2 ∧  b^{1, 1064}_1 ∧  b^{1, 1064}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1064}_2 ∨ -b^{1, 1064}_1 ∨ -b^{1, 1064}_0 ∨ false 
c  in DIMACS:
-4352 -4353 -4354  0

c i = 1065
c  -2+1 --> -1
c    ( b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧  p_1065) -> ( b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0)
c  in CNF:
c    -b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨  b^{1, 1066}_2
c    -b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_1
c    -b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨  b^{1, 1066}_0
c  in DIMACS:
-4355 -4356  4357 -1065  4358 0
-4355 -4356  4357 -1065 -4359 0
-4355 -4356  4357 -1065  4360 0

c  -1+1 --> 0
c    ( b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧  p_1065) -> (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧ -b^{1, 1066}_0)
c  in CNF:
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_2
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_1
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_0
c  in DIMACS:
-4355  4356 -4357 -1065 -4358 0
-4355  4356 -4357 -1065 -4359 0
-4355  4356 -4357 -1065 -4360 0

c  0+1 --> 1
c    (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧  p_1065) -> (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0)
c  in CNF:
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_2
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_1
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨  b^{1, 1066}_0
c  in DIMACS:
 4355  4356  4357 -1065 -4358 0
 4355  4356  4357 -1065 -4359 0
 4355  4356  4357 -1065  4360 0

c  1+1 --> 2
c    (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧  p_1065) -> (-b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0)
c  in CNF:
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_2
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨  b^{1, 1066}_1
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ -p_1065 ∨ -b^{1, 1066}_0
c  in DIMACS:
 4355  4356 -4357 -1065 -4358 0
 4355  4356 -4357 -1065  4359 0
 4355  4356 -4357 -1065 -4360 0

c  2+1 --> break 
c    (-b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 4355 -4356  4357 -1065 1162 0


c  2-1 --> 1
c    (-b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧ -p_1065) -> (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0)
c  in CNF:
c     b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_2
c     b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_1
c     b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨  b^{1, 1066}_0
c  in DIMACS:
 4355 -4356  4357  1065 -4358 0
 4355 -4356  4357  1065 -4359 0
 4355 -4356  4357  1065  4360 0

c  1-1 --> 0
c    (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧ -p_1065) -> (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧ -b^{1, 1066}_0)
c  in CNF:
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_2
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_1
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_0
c  in DIMACS:
 4355  4356 -4357  1065 -4358 0
 4355  4356 -4357  1065 -4359 0
 4355  4356 -4357  1065 -4360 0

c  0-1 --> -1
c    (-b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧ -p_1065) -> ( b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0)
c  in CNF:
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨  b^{1, 1066}_2
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_1
c     b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨  b^{1, 1066}_0
c  in DIMACS:
 4355  4356  4357  1065  4358 0
 4355  4356  4357  1065 -4359 0
 4355  4356  4357  1065  4360 0

c  -1-1 --> -2
c    ( b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧ -p_1065) -> ( b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0)
c  in CNF:
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨  b^{1, 1066}_2
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨  b^{1, 1066}_1
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨  p_1065 ∨ -b^{1, 1066}_0
c  in DIMACS:
-4355  4356 -4357  1065  4358 0
-4355  4356 -4357  1065  4359 0
-4355  4356 -4357  1065 -4360 0

c  -2-1 --> break 
c    ( b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-4355 -4356  4357  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1065}_2 ∧ -b^{1, 1065}_1 ∧ -b^{1, 1065}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1065}_2 ∨  b^{1, 1065}_1 ∨  b^{1, 1065}_0 ∨ false 
c  in DIMACS:
-4355  4356  4357  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧ true) 
c  in CNF:
c     b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ false 
c  in DIMACS:
 4355 -4356 -4357  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1065}_2 ∧  b^{1, 1065}_1 ∧  b^{1, 1065}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1065}_2 ∨ -b^{1, 1065}_1 ∨ -b^{1, 1065}_0 ∨ false 
c  in DIMACS:
-4355 -4356 -4357  0

c i = 1066
c  -2+1 --> -1
c    ( b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧  p_1066) -> ( b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0)
c  in CNF:
c    -b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨  b^{1, 1067}_2
c    -b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_1
c    -b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨  b^{1, 1067}_0
c  in DIMACS:
-4358 -4359  4360 -1066  4361 0
-4358 -4359  4360 -1066 -4362 0
-4358 -4359  4360 -1066  4363 0

c  -1+1 --> 0
c    ( b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧  p_1066) -> (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧ -b^{1, 1067}_0)
c  in CNF:
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_2
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_1
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_0
c  in DIMACS:
-4358  4359 -4360 -1066 -4361 0
-4358  4359 -4360 -1066 -4362 0
-4358  4359 -4360 -1066 -4363 0

c  0+1 --> 1
c    (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧  p_1066) -> (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0)
c  in CNF:
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_2
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_1
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨  b^{1, 1067}_0
c  in DIMACS:
 4358  4359  4360 -1066 -4361 0
 4358  4359  4360 -1066 -4362 0
 4358  4359  4360 -1066  4363 0

c  1+1 --> 2
c    (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧  p_1066) -> (-b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0)
c  in CNF:
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_2
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨  b^{1, 1067}_1
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ -p_1066 ∨ -b^{1, 1067}_0
c  in DIMACS:
 4358  4359 -4360 -1066 -4361 0
 4358  4359 -4360 -1066  4362 0
 4358  4359 -4360 -1066 -4363 0

c  2+1 --> break 
c    (-b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 4358 -4359  4360 -1066 1162 0


c  2-1 --> 1
c    (-b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧ -p_1066) -> (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0)
c  in CNF:
c     b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_2
c     b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_1
c     b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨  b^{1, 1067}_0
c  in DIMACS:
 4358 -4359  4360  1066 -4361 0
 4358 -4359  4360  1066 -4362 0
 4358 -4359  4360  1066  4363 0

c  1-1 --> 0
c    (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧ -p_1066) -> (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧ -b^{1, 1067}_0)
c  in CNF:
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_2
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_1
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_0
c  in DIMACS:
 4358  4359 -4360  1066 -4361 0
 4358  4359 -4360  1066 -4362 0
 4358  4359 -4360  1066 -4363 0

c  0-1 --> -1
c    (-b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧ -p_1066) -> ( b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0)
c  in CNF:
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨  b^{1, 1067}_2
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_1
c     b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨  b^{1, 1067}_0
c  in DIMACS:
 4358  4359  4360  1066  4361 0
 4358  4359  4360  1066 -4362 0
 4358  4359  4360  1066  4363 0

c  -1-1 --> -2
c    ( b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧ -p_1066) -> ( b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0)
c  in CNF:
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨  b^{1, 1067}_2
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨  b^{1, 1067}_1
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨  p_1066 ∨ -b^{1, 1067}_0
c  in DIMACS:
-4358  4359 -4360  1066  4361 0
-4358  4359 -4360  1066  4362 0
-4358  4359 -4360  1066 -4363 0

c  -2-1 --> break 
c    ( b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-4358 -4359  4360  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1066}_2 ∧ -b^{1, 1066}_1 ∧ -b^{1, 1066}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1066}_2 ∨  b^{1, 1066}_1 ∨  b^{1, 1066}_0 ∨ false 
c  in DIMACS:
-4358  4359  4360  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧ true) 
c  in CNF:
c     b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ false 
c  in DIMACS:
 4358 -4359 -4360  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1066}_2 ∧  b^{1, 1066}_1 ∧  b^{1, 1066}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1066}_2 ∨ -b^{1, 1066}_1 ∨ -b^{1, 1066}_0 ∨ false 
c  in DIMACS:
-4358 -4359 -4360  0

c i = 1067
c  -2+1 --> -1
c    ( b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧  p_1067) -> ( b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0)
c  in CNF:
c    -b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨  b^{1, 1068}_2
c    -b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_1
c    -b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨  b^{1, 1068}_0
c  in DIMACS:
-4361 -4362  4363 -1067  4364 0
-4361 -4362  4363 -1067 -4365 0
-4361 -4362  4363 -1067  4366 0

c  -1+1 --> 0
c    ( b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧  p_1067) -> (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧ -b^{1, 1068}_0)
c  in CNF:
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_2
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_1
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_0
c  in DIMACS:
-4361  4362 -4363 -1067 -4364 0
-4361  4362 -4363 -1067 -4365 0
-4361  4362 -4363 -1067 -4366 0

c  0+1 --> 1
c    (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧  p_1067) -> (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0)
c  in CNF:
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_2
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_1
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨  b^{1, 1068}_0
c  in DIMACS:
 4361  4362  4363 -1067 -4364 0
 4361  4362  4363 -1067 -4365 0
 4361  4362  4363 -1067  4366 0

c  1+1 --> 2
c    (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧  p_1067) -> (-b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0)
c  in CNF:
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_2
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨  b^{1, 1068}_1
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ -p_1067 ∨ -b^{1, 1068}_0
c  in DIMACS:
 4361  4362 -4363 -1067 -4364 0
 4361  4362 -4363 -1067  4365 0
 4361  4362 -4363 -1067 -4366 0

c  2+1 --> break 
c    (-b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧  p_1067) -> break
c  in CNF:
c     b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ -p_1067 ∨ break
c  in DIMACS:
 4361 -4362  4363 -1067 1162 0


c  2-1 --> 1
c    (-b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧ -p_1067) -> (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0)
c  in CNF:
c     b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_2
c     b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_1
c     b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨  b^{1, 1068}_0
c  in DIMACS:
 4361 -4362  4363  1067 -4364 0
 4361 -4362  4363  1067 -4365 0
 4361 -4362  4363  1067  4366 0

c  1-1 --> 0
c    (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧ -p_1067) -> (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧ -b^{1, 1068}_0)
c  in CNF:
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_2
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_1
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_0
c  in DIMACS:
 4361  4362 -4363  1067 -4364 0
 4361  4362 -4363  1067 -4365 0
 4361  4362 -4363  1067 -4366 0

c  0-1 --> -1
c    (-b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧ -p_1067) -> ( b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0)
c  in CNF:
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨  b^{1, 1068}_2
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_1
c     b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨  b^{1, 1068}_0
c  in DIMACS:
 4361  4362  4363  1067  4364 0
 4361  4362  4363  1067 -4365 0
 4361  4362  4363  1067  4366 0

c  -1-1 --> -2
c    ( b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧ -p_1067) -> ( b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0)
c  in CNF:
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨  b^{1, 1068}_2
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨  b^{1, 1068}_1
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨  p_1067 ∨ -b^{1, 1068}_0
c  in DIMACS:
-4361  4362 -4363  1067  4364 0
-4361  4362 -4363  1067  4365 0
-4361  4362 -4363  1067 -4366 0

c  -2-1 --> break 
c    ( b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧ -p_1067) -> break
c  in CNF:
c    -b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨  p_1067 ∨ break
c  in DIMACS:
-4361 -4362  4363  1067 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1067}_2 ∧ -b^{1, 1067}_1 ∧ -b^{1, 1067}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1067}_2 ∨  b^{1, 1067}_1 ∨  b^{1, 1067}_0 ∨ false 
c  in DIMACS:
-4361  4362  4363  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧ true) 
c  in CNF:
c     b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ false 
c  in DIMACS:
 4361 -4362 -4363  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1067}_2 ∧  b^{1, 1067}_1 ∧  b^{1, 1067}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1067}_2 ∨ -b^{1, 1067}_1 ∨ -b^{1, 1067}_0 ∨ false 
c  in DIMACS:
-4361 -4362 -4363  0

c i = 1068
c  -2+1 --> -1
c    ( b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧  p_1068) -> ( b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0)
c  in CNF:
c    -b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨  b^{1, 1069}_2
c    -b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_1
c    -b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨  b^{1, 1069}_0
c  in DIMACS:
-4364 -4365  4366 -1068  4367 0
-4364 -4365  4366 -1068 -4368 0
-4364 -4365  4366 -1068  4369 0

c  -1+1 --> 0
c    ( b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧  p_1068) -> (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧ -b^{1, 1069}_0)
c  in CNF:
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_2
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_1
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_0
c  in DIMACS:
-4364  4365 -4366 -1068 -4367 0
-4364  4365 -4366 -1068 -4368 0
-4364  4365 -4366 -1068 -4369 0

c  0+1 --> 1
c    (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧  p_1068) -> (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0)
c  in CNF:
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_2
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_1
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨  b^{1, 1069}_0
c  in DIMACS:
 4364  4365  4366 -1068 -4367 0
 4364  4365  4366 -1068 -4368 0
 4364  4365  4366 -1068  4369 0

c  1+1 --> 2
c    (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧  p_1068) -> (-b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0)
c  in CNF:
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_2
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨  b^{1, 1069}_1
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ -p_1068 ∨ -b^{1, 1069}_0
c  in DIMACS:
 4364  4365 -4366 -1068 -4367 0
 4364  4365 -4366 -1068  4368 0
 4364  4365 -4366 -1068 -4369 0

c  2+1 --> break 
c    (-b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 4364 -4365  4366 -1068 1162 0


c  2-1 --> 1
c    (-b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧ -p_1068) -> (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0)
c  in CNF:
c     b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_2
c     b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_1
c     b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨  b^{1, 1069}_0
c  in DIMACS:
 4364 -4365  4366  1068 -4367 0
 4364 -4365  4366  1068 -4368 0
 4364 -4365  4366  1068  4369 0

c  1-1 --> 0
c    (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧ -p_1068) -> (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧ -b^{1, 1069}_0)
c  in CNF:
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_2
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_1
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_0
c  in DIMACS:
 4364  4365 -4366  1068 -4367 0
 4364  4365 -4366  1068 -4368 0
 4364  4365 -4366  1068 -4369 0

c  0-1 --> -1
c    (-b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧ -p_1068) -> ( b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0)
c  in CNF:
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨  b^{1, 1069}_2
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_1
c     b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨  b^{1, 1069}_0
c  in DIMACS:
 4364  4365  4366  1068  4367 0
 4364  4365  4366  1068 -4368 0
 4364  4365  4366  1068  4369 0

c  -1-1 --> -2
c    ( b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧ -p_1068) -> ( b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0)
c  in CNF:
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨  b^{1, 1069}_2
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨  b^{1, 1069}_1
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨  p_1068 ∨ -b^{1, 1069}_0
c  in DIMACS:
-4364  4365 -4366  1068  4367 0
-4364  4365 -4366  1068  4368 0
-4364  4365 -4366  1068 -4369 0

c  -2-1 --> break 
c    ( b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-4364 -4365  4366  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1068}_2 ∧ -b^{1, 1068}_1 ∧ -b^{1, 1068}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1068}_2 ∨  b^{1, 1068}_1 ∨  b^{1, 1068}_0 ∨ false 
c  in DIMACS:
-4364  4365  4366  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧ true) 
c  in CNF:
c     b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ false 
c  in DIMACS:
 4364 -4365 -4366  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1068}_2 ∧  b^{1, 1068}_1 ∧  b^{1, 1068}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1068}_2 ∨ -b^{1, 1068}_1 ∨ -b^{1, 1068}_0 ∨ false 
c  in DIMACS:
-4364 -4365 -4366  0

c i = 1069
c  -2+1 --> -1
c    ( b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧  p_1069) -> ( b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0)
c  in CNF:
c    -b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨  b^{1, 1070}_2
c    -b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_1
c    -b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨  b^{1, 1070}_0
c  in DIMACS:
-4367 -4368  4369 -1069  4370 0
-4367 -4368  4369 -1069 -4371 0
-4367 -4368  4369 -1069  4372 0

c  -1+1 --> 0
c    ( b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧  p_1069) -> (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧ -b^{1, 1070}_0)
c  in CNF:
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_2
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_1
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_0
c  in DIMACS:
-4367  4368 -4369 -1069 -4370 0
-4367  4368 -4369 -1069 -4371 0
-4367  4368 -4369 -1069 -4372 0

c  0+1 --> 1
c    (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧  p_1069) -> (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0)
c  in CNF:
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_2
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_1
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨  b^{1, 1070}_0
c  in DIMACS:
 4367  4368  4369 -1069 -4370 0
 4367  4368  4369 -1069 -4371 0
 4367  4368  4369 -1069  4372 0

c  1+1 --> 2
c    (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧  p_1069) -> (-b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0)
c  in CNF:
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_2
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨  b^{1, 1070}_1
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ -p_1069 ∨ -b^{1, 1070}_0
c  in DIMACS:
 4367  4368 -4369 -1069 -4370 0
 4367  4368 -4369 -1069  4371 0
 4367  4368 -4369 -1069 -4372 0

c  2+1 --> break 
c    (-b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧  p_1069) -> break
c  in CNF:
c     b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ -p_1069 ∨ break
c  in DIMACS:
 4367 -4368  4369 -1069 1162 0


c  2-1 --> 1
c    (-b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧ -p_1069) -> (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0)
c  in CNF:
c     b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_2
c     b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_1
c     b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨  b^{1, 1070}_0
c  in DIMACS:
 4367 -4368  4369  1069 -4370 0
 4367 -4368  4369  1069 -4371 0
 4367 -4368  4369  1069  4372 0

c  1-1 --> 0
c    (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧ -p_1069) -> (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧ -b^{1, 1070}_0)
c  in CNF:
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_2
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_1
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_0
c  in DIMACS:
 4367  4368 -4369  1069 -4370 0
 4367  4368 -4369  1069 -4371 0
 4367  4368 -4369  1069 -4372 0

c  0-1 --> -1
c    (-b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧ -p_1069) -> ( b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0)
c  in CNF:
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨  b^{1, 1070}_2
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_1
c     b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨  b^{1, 1070}_0
c  in DIMACS:
 4367  4368  4369  1069  4370 0
 4367  4368  4369  1069 -4371 0
 4367  4368  4369  1069  4372 0

c  -1-1 --> -2
c    ( b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧ -p_1069) -> ( b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0)
c  in CNF:
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨  b^{1, 1070}_2
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨  b^{1, 1070}_1
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨  p_1069 ∨ -b^{1, 1070}_0
c  in DIMACS:
-4367  4368 -4369  1069  4370 0
-4367  4368 -4369  1069  4371 0
-4367  4368 -4369  1069 -4372 0

c  -2-1 --> break 
c    ( b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧ -p_1069) -> break
c  in CNF:
c    -b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨  p_1069 ∨ break
c  in DIMACS:
-4367 -4368  4369  1069 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1069}_2 ∧ -b^{1, 1069}_1 ∧ -b^{1, 1069}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1069}_2 ∨  b^{1, 1069}_1 ∨  b^{1, 1069}_0 ∨ false 
c  in DIMACS:
-4367  4368  4369  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧ true) 
c  in CNF:
c     b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ false 
c  in DIMACS:
 4367 -4368 -4369  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1069}_2 ∧  b^{1, 1069}_1 ∧  b^{1, 1069}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1069}_2 ∨ -b^{1, 1069}_1 ∨ -b^{1, 1069}_0 ∨ false 
c  in DIMACS:
-4367 -4368 -4369  0

c i = 1070
c  -2+1 --> -1
c    ( b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧  p_1070) -> ( b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0)
c  in CNF:
c    -b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨  b^{1, 1071}_2
c    -b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_1
c    -b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨  b^{1, 1071}_0
c  in DIMACS:
-4370 -4371  4372 -1070  4373 0
-4370 -4371  4372 -1070 -4374 0
-4370 -4371  4372 -1070  4375 0

c  -1+1 --> 0
c    ( b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧  p_1070) -> (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧ -b^{1, 1071}_0)
c  in CNF:
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_2
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_1
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_0
c  in DIMACS:
-4370  4371 -4372 -1070 -4373 0
-4370  4371 -4372 -1070 -4374 0
-4370  4371 -4372 -1070 -4375 0

c  0+1 --> 1
c    (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧  p_1070) -> (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0)
c  in CNF:
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_2
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_1
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨  b^{1, 1071}_0
c  in DIMACS:
 4370  4371  4372 -1070 -4373 0
 4370  4371  4372 -1070 -4374 0
 4370  4371  4372 -1070  4375 0

c  1+1 --> 2
c    (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧  p_1070) -> (-b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0)
c  in CNF:
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_2
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨  b^{1, 1071}_1
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ -p_1070 ∨ -b^{1, 1071}_0
c  in DIMACS:
 4370  4371 -4372 -1070 -4373 0
 4370  4371 -4372 -1070  4374 0
 4370  4371 -4372 -1070 -4375 0

c  2+1 --> break 
c    (-b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 4370 -4371  4372 -1070 1162 0


c  2-1 --> 1
c    (-b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧ -p_1070) -> (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0)
c  in CNF:
c     b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_2
c     b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_1
c     b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨  b^{1, 1071}_0
c  in DIMACS:
 4370 -4371  4372  1070 -4373 0
 4370 -4371  4372  1070 -4374 0
 4370 -4371  4372  1070  4375 0

c  1-1 --> 0
c    (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧ -p_1070) -> (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧ -b^{1, 1071}_0)
c  in CNF:
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_2
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_1
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_0
c  in DIMACS:
 4370  4371 -4372  1070 -4373 0
 4370  4371 -4372  1070 -4374 0
 4370  4371 -4372  1070 -4375 0

c  0-1 --> -1
c    (-b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧ -p_1070) -> ( b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0)
c  in CNF:
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨  b^{1, 1071}_2
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_1
c     b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨  b^{1, 1071}_0
c  in DIMACS:
 4370  4371  4372  1070  4373 0
 4370  4371  4372  1070 -4374 0
 4370  4371  4372  1070  4375 0

c  -1-1 --> -2
c    ( b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧ -p_1070) -> ( b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0)
c  in CNF:
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨  b^{1, 1071}_2
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨  b^{1, 1071}_1
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨  p_1070 ∨ -b^{1, 1071}_0
c  in DIMACS:
-4370  4371 -4372  1070  4373 0
-4370  4371 -4372  1070  4374 0
-4370  4371 -4372  1070 -4375 0

c  -2-1 --> break 
c    ( b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-4370 -4371  4372  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1070}_2 ∧ -b^{1, 1070}_1 ∧ -b^{1, 1070}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1070}_2 ∨  b^{1, 1070}_1 ∨  b^{1, 1070}_0 ∨ false 
c  in DIMACS:
-4370  4371  4372  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧ true) 
c  in CNF:
c     b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ false 
c  in DIMACS:
 4370 -4371 -4372  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1070}_2 ∧  b^{1, 1070}_1 ∧  b^{1, 1070}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1070}_2 ∨ -b^{1, 1070}_1 ∨ -b^{1, 1070}_0 ∨ false 
c  in DIMACS:
-4370 -4371 -4372  0

c i = 1071
c  -2+1 --> -1
c    ( b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧  p_1071) -> ( b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0)
c  in CNF:
c    -b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨  b^{1, 1072}_2
c    -b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_1
c    -b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨  b^{1, 1072}_0
c  in DIMACS:
-4373 -4374  4375 -1071  4376 0
-4373 -4374  4375 -1071 -4377 0
-4373 -4374  4375 -1071  4378 0

c  -1+1 --> 0
c    ( b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧  p_1071) -> (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧ -b^{1, 1072}_0)
c  in CNF:
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_2
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_1
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_0
c  in DIMACS:
-4373  4374 -4375 -1071 -4376 0
-4373  4374 -4375 -1071 -4377 0
-4373  4374 -4375 -1071 -4378 0

c  0+1 --> 1
c    (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧  p_1071) -> (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0)
c  in CNF:
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_2
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_1
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨  b^{1, 1072}_0
c  in DIMACS:
 4373  4374  4375 -1071 -4376 0
 4373  4374  4375 -1071 -4377 0
 4373  4374  4375 -1071  4378 0

c  1+1 --> 2
c    (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧  p_1071) -> (-b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0)
c  in CNF:
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_2
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨  b^{1, 1072}_1
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ -p_1071 ∨ -b^{1, 1072}_0
c  in DIMACS:
 4373  4374 -4375 -1071 -4376 0
 4373  4374 -4375 -1071  4377 0
 4373  4374 -4375 -1071 -4378 0

c  2+1 --> break 
c    (-b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 4373 -4374  4375 -1071 1162 0


c  2-1 --> 1
c    (-b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧ -p_1071) -> (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0)
c  in CNF:
c     b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_2
c     b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_1
c     b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨  b^{1, 1072}_0
c  in DIMACS:
 4373 -4374  4375  1071 -4376 0
 4373 -4374  4375  1071 -4377 0
 4373 -4374  4375  1071  4378 0

c  1-1 --> 0
c    (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧ -p_1071) -> (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧ -b^{1, 1072}_0)
c  in CNF:
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_2
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_1
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_0
c  in DIMACS:
 4373  4374 -4375  1071 -4376 0
 4373  4374 -4375  1071 -4377 0
 4373  4374 -4375  1071 -4378 0

c  0-1 --> -1
c    (-b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧ -p_1071) -> ( b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0)
c  in CNF:
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨  b^{1, 1072}_2
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_1
c     b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨  b^{1, 1072}_0
c  in DIMACS:
 4373  4374  4375  1071  4376 0
 4373  4374  4375  1071 -4377 0
 4373  4374  4375  1071  4378 0

c  -1-1 --> -2
c    ( b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧ -p_1071) -> ( b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0)
c  in CNF:
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨  b^{1, 1072}_2
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨  b^{1, 1072}_1
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨  p_1071 ∨ -b^{1, 1072}_0
c  in DIMACS:
-4373  4374 -4375  1071  4376 0
-4373  4374 -4375  1071  4377 0
-4373  4374 -4375  1071 -4378 0

c  -2-1 --> break 
c    ( b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-4373 -4374  4375  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1071}_2 ∧ -b^{1, 1071}_1 ∧ -b^{1, 1071}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1071}_2 ∨  b^{1, 1071}_1 ∨  b^{1, 1071}_0 ∨ false 
c  in DIMACS:
-4373  4374  4375  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧ true) 
c  in CNF:
c     b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ false 
c  in DIMACS:
 4373 -4374 -4375  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1071}_2 ∧  b^{1, 1071}_1 ∧  b^{1, 1071}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1071}_2 ∨ -b^{1, 1071}_1 ∨ -b^{1, 1071}_0 ∨ false 
c  in DIMACS:
-4373 -4374 -4375  0

c i = 1072
c  -2+1 --> -1
c    ( b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧  p_1072) -> ( b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0)
c  in CNF:
c    -b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨  b^{1, 1073}_2
c    -b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_1
c    -b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨  b^{1, 1073}_0
c  in DIMACS:
-4376 -4377  4378 -1072  4379 0
-4376 -4377  4378 -1072 -4380 0
-4376 -4377  4378 -1072  4381 0

c  -1+1 --> 0
c    ( b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧  p_1072) -> (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧ -b^{1, 1073}_0)
c  in CNF:
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_2
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_1
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_0
c  in DIMACS:
-4376  4377 -4378 -1072 -4379 0
-4376  4377 -4378 -1072 -4380 0
-4376  4377 -4378 -1072 -4381 0

c  0+1 --> 1
c    (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧  p_1072) -> (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0)
c  in CNF:
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_2
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_1
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨  b^{1, 1073}_0
c  in DIMACS:
 4376  4377  4378 -1072 -4379 0
 4376  4377  4378 -1072 -4380 0
 4376  4377  4378 -1072  4381 0

c  1+1 --> 2
c    (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧  p_1072) -> (-b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0)
c  in CNF:
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_2
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨  b^{1, 1073}_1
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ -p_1072 ∨ -b^{1, 1073}_0
c  in DIMACS:
 4376  4377 -4378 -1072 -4379 0
 4376  4377 -4378 -1072  4380 0
 4376  4377 -4378 -1072 -4381 0

c  2+1 --> break 
c    (-b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 4376 -4377  4378 -1072 1162 0


c  2-1 --> 1
c    (-b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧ -p_1072) -> (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0)
c  in CNF:
c     b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_2
c     b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_1
c     b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨  b^{1, 1073}_0
c  in DIMACS:
 4376 -4377  4378  1072 -4379 0
 4376 -4377  4378  1072 -4380 0
 4376 -4377  4378  1072  4381 0

c  1-1 --> 0
c    (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧ -p_1072) -> (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧ -b^{1, 1073}_0)
c  in CNF:
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_2
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_1
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_0
c  in DIMACS:
 4376  4377 -4378  1072 -4379 0
 4376  4377 -4378  1072 -4380 0
 4376  4377 -4378  1072 -4381 0

c  0-1 --> -1
c    (-b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧ -p_1072) -> ( b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0)
c  in CNF:
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨  b^{1, 1073}_2
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_1
c     b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨  b^{1, 1073}_0
c  in DIMACS:
 4376  4377  4378  1072  4379 0
 4376  4377  4378  1072 -4380 0
 4376  4377  4378  1072  4381 0

c  -1-1 --> -2
c    ( b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧ -p_1072) -> ( b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0)
c  in CNF:
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨  b^{1, 1073}_2
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨  b^{1, 1073}_1
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨  p_1072 ∨ -b^{1, 1073}_0
c  in DIMACS:
-4376  4377 -4378  1072  4379 0
-4376  4377 -4378  1072  4380 0
-4376  4377 -4378  1072 -4381 0

c  -2-1 --> break 
c    ( b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-4376 -4377  4378  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1072}_2 ∧ -b^{1, 1072}_1 ∧ -b^{1, 1072}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1072}_2 ∨  b^{1, 1072}_1 ∨  b^{1, 1072}_0 ∨ false 
c  in DIMACS:
-4376  4377  4378  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧ true) 
c  in CNF:
c     b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ false 
c  in DIMACS:
 4376 -4377 -4378  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1072}_2 ∧  b^{1, 1072}_1 ∧  b^{1, 1072}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1072}_2 ∨ -b^{1, 1072}_1 ∨ -b^{1, 1072}_0 ∨ false 
c  in DIMACS:
-4376 -4377 -4378  0

c i = 1073
c  -2+1 --> -1
c    ( b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧  p_1073) -> ( b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0)
c  in CNF:
c    -b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨  b^{1, 1074}_2
c    -b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_1
c    -b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨  b^{1, 1074}_0
c  in DIMACS:
-4379 -4380  4381 -1073  4382 0
-4379 -4380  4381 -1073 -4383 0
-4379 -4380  4381 -1073  4384 0

c  -1+1 --> 0
c    ( b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧  p_1073) -> (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧ -b^{1, 1074}_0)
c  in CNF:
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_2
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_1
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_0
c  in DIMACS:
-4379  4380 -4381 -1073 -4382 0
-4379  4380 -4381 -1073 -4383 0
-4379  4380 -4381 -1073 -4384 0

c  0+1 --> 1
c    (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧  p_1073) -> (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0)
c  in CNF:
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_2
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_1
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨  b^{1, 1074}_0
c  in DIMACS:
 4379  4380  4381 -1073 -4382 0
 4379  4380  4381 -1073 -4383 0
 4379  4380  4381 -1073  4384 0

c  1+1 --> 2
c    (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧  p_1073) -> (-b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0)
c  in CNF:
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_2
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨  b^{1, 1074}_1
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ -p_1073 ∨ -b^{1, 1074}_0
c  in DIMACS:
 4379  4380 -4381 -1073 -4382 0
 4379  4380 -4381 -1073  4383 0
 4379  4380 -4381 -1073 -4384 0

c  2+1 --> break 
c    (-b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧  p_1073) -> break
c  in CNF:
c     b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ -p_1073 ∨ break
c  in DIMACS:
 4379 -4380  4381 -1073 1162 0


c  2-1 --> 1
c    (-b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧ -p_1073) -> (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0)
c  in CNF:
c     b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_2
c     b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_1
c     b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨  b^{1, 1074}_0
c  in DIMACS:
 4379 -4380  4381  1073 -4382 0
 4379 -4380  4381  1073 -4383 0
 4379 -4380  4381  1073  4384 0

c  1-1 --> 0
c    (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧ -p_1073) -> (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧ -b^{1, 1074}_0)
c  in CNF:
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_2
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_1
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_0
c  in DIMACS:
 4379  4380 -4381  1073 -4382 0
 4379  4380 -4381  1073 -4383 0
 4379  4380 -4381  1073 -4384 0

c  0-1 --> -1
c    (-b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧ -p_1073) -> ( b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0)
c  in CNF:
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨  b^{1, 1074}_2
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_1
c     b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨  b^{1, 1074}_0
c  in DIMACS:
 4379  4380  4381  1073  4382 0
 4379  4380  4381  1073 -4383 0
 4379  4380  4381  1073  4384 0

c  -1-1 --> -2
c    ( b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧ -p_1073) -> ( b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0)
c  in CNF:
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨  b^{1, 1074}_2
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨  b^{1, 1074}_1
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨  p_1073 ∨ -b^{1, 1074}_0
c  in DIMACS:
-4379  4380 -4381  1073  4382 0
-4379  4380 -4381  1073  4383 0
-4379  4380 -4381  1073 -4384 0

c  -2-1 --> break 
c    ( b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧ -p_1073) -> break
c  in CNF:
c    -b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨  p_1073 ∨ break
c  in DIMACS:
-4379 -4380  4381  1073 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1073}_2 ∧ -b^{1, 1073}_1 ∧ -b^{1, 1073}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1073}_2 ∨  b^{1, 1073}_1 ∨  b^{1, 1073}_0 ∨ false 
c  in DIMACS:
-4379  4380  4381  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧ true) 
c  in CNF:
c     b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ false 
c  in DIMACS:
 4379 -4380 -4381  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1073}_2 ∧  b^{1, 1073}_1 ∧  b^{1, 1073}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1073}_2 ∨ -b^{1, 1073}_1 ∨ -b^{1, 1073}_0 ∨ false 
c  in DIMACS:
-4379 -4380 -4381  0

c i = 1074
c  -2+1 --> -1
c    ( b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧  p_1074) -> ( b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0)
c  in CNF:
c    -b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨  b^{1, 1075}_2
c    -b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_1
c    -b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨  b^{1, 1075}_0
c  in DIMACS:
-4382 -4383  4384 -1074  4385 0
-4382 -4383  4384 -1074 -4386 0
-4382 -4383  4384 -1074  4387 0

c  -1+1 --> 0
c    ( b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧  p_1074) -> (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧ -b^{1, 1075}_0)
c  in CNF:
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_2
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_1
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_0
c  in DIMACS:
-4382  4383 -4384 -1074 -4385 0
-4382  4383 -4384 -1074 -4386 0
-4382  4383 -4384 -1074 -4387 0

c  0+1 --> 1
c    (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧  p_1074) -> (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0)
c  in CNF:
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_2
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_1
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨  b^{1, 1075}_0
c  in DIMACS:
 4382  4383  4384 -1074 -4385 0
 4382  4383  4384 -1074 -4386 0
 4382  4383  4384 -1074  4387 0

c  1+1 --> 2
c    (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧  p_1074) -> (-b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0)
c  in CNF:
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_2
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨  b^{1, 1075}_1
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ -p_1074 ∨ -b^{1, 1075}_0
c  in DIMACS:
 4382  4383 -4384 -1074 -4385 0
 4382  4383 -4384 -1074  4386 0
 4382  4383 -4384 -1074 -4387 0

c  2+1 --> break 
c    (-b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 4382 -4383  4384 -1074 1162 0


c  2-1 --> 1
c    (-b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧ -p_1074) -> (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0)
c  in CNF:
c     b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_2
c     b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_1
c     b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨  b^{1, 1075}_0
c  in DIMACS:
 4382 -4383  4384  1074 -4385 0
 4382 -4383  4384  1074 -4386 0
 4382 -4383  4384  1074  4387 0

c  1-1 --> 0
c    (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧ -p_1074) -> (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧ -b^{1, 1075}_0)
c  in CNF:
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_2
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_1
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_0
c  in DIMACS:
 4382  4383 -4384  1074 -4385 0
 4382  4383 -4384  1074 -4386 0
 4382  4383 -4384  1074 -4387 0

c  0-1 --> -1
c    (-b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧ -p_1074) -> ( b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0)
c  in CNF:
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨  b^{1, 1075}_2
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_1
c     b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨  b^{1, 1075}_0
c  in DIMACS:
 4382  4383  4384  1074  4385 0
 4382  4383  4384  1074 -4386 0
 4382  4383  4384  1074  4387 0

c  -1-1 --> -2
c    ( b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧ -p_1074) -> ( b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0)
c  in CNF:
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨  b^{1, 1075}_2
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨  b^{1, 1075}_1
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨  p_1074 ∨ -b^{1, 1075}_0
c  in DIMACS:
-4382  4383 -4384  1074  4385 0
-4382  4383 -4384  1074  4386 0
-4382  4383 -4384  1074 -4387 0

c  -2-1 --> break 
c    ( b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-4382 -4383  4384  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1074}_2 ∧ -b^{1, 1074}_1 ∧ -b^{1, 1074}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1074}_2 ∨  b^{1, 1074}_1 ∨  b^{1, 1074}_0 ∨ false 
c  in DIMACS:
-4382  4383  4384  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧ true) 
c  in CNF:
c     b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ false 
c  in DIMACS:
 4382 -4383 -4384  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1074}_2 ∧  b^{1, 1074}_1 ∧  b^{1, 1074}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1074}_2 ∨ -b^{1, 1074}_1 ∨ -b^{1, 1074}_0 ∨ false 
c  in DIMACS:
-4382 -4383 -4384  0

c i = 1075
c  -2+1 --> -1
c    ( b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧  p_1075) -> ( b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0)
c  in CNF:
c    -b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨  b^{1, 1076}_2
c    -b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_1
c    -b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨  b^{1, 1076}_0
c  in DIMACS:
-4385 -4386  4387 -1075  4388 0
-4385 -4386  4387 -1075 -4389 0
-4385 -4386  4387 -1075  4390 0

c  -1+1 --> 0
c    ( b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧  p_1075) -> (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧ -b^{1, 1076}_0)
c  in CNF:
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_2
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_1
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_0
c  in DIMACS:
-4385  4386 -4387 -1075 -4388 0
-4385  4386 -4387 -1075 -4389 0
-4385  4386 -4387 -1075 -4390 0

c  0+1 --> 1
c    (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧  p_1075) -> (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0)
c  in CNF:
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_2
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_1
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨  b^{1, 1076}_0
c  in DIMACS:
 4385  4386  4387 -1075 -4388 0
 4385  4386  4387 -1075 -4389 0
 4385  4386  4387 -1075  4390 0

c  1+1 --> 2
c    (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧  p_1075) -> (-b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0)
c  in CNF:
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_2
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨  b^{1, 1076}_1
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ -p_1075 ∨ -b^{1, 1076}_0
c  in DIMACS:
 4385  4386 -4387 -1075 -4388 0
 4385  4386 -4387 -1075  4389 0
 4385  4386 -4387 -1075 -4390 0

c  2+1 --> break 
c    (-b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧  p_1075) -> break
c  in CNF:
c     b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ -p_1075 ∨ break
c  in DIMACS:
 4385 -4386  4387 -1075 1162 0


c  2-1 --> 1
c    (-b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧ -p_1075) -> (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0)
c  in CNF:
c     b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_2
c     b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_1
c     b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨  b^{1, 1076}_0
c  in DIMACS:
 4385 -4386  4387  1075 -4388 0
 4385 -4386  4387  1075 -4389 0
 4385 -4386  4387  1075  4390 0

c  1-1 --> 0
c    (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧ -p_1075) -> (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧ -b^{1, 1076}_0)
c  in CNF:
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_2
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_1
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_0
c  in DIMACS:
 4385  4386 -4387  1075 -4388 0
 4385  4386 -4387  1075 -4389 0
 4385  4386 -4387  1075 -4390 0

c  0-1 --> -1
c    (-b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧ -p_1075) -> ( b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0)
c  in CNF:
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨  b^{1, 1076}_2
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_1
c     b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨  b^{1, 1076}_0
c  in DIMACS:
 4385  4386  4387  1075  4388 0
 4385  4386  4387  1075 -4389 0
 4385  4386  4387  1075  4390 0

c  -1-1 --> -2
c    ( b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧ -p_1075) -> ( b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0)
c  in CNF:
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨  b^{1, 1076}_2
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨  b^{1, 1076}_1
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨  p_1075 ∨ -b^{1, 1076}_0
c  in DIMACS:
-4385  4386 -4387  1075  4388 0
-4385  4386 -4387  1075  4389 0
-4385  4386 -4387  1075 -4390 0

c  -2-1 --> break 
c    ( b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧ -p_1075) -> break
c  in CNF:
c    -b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨  p_1075 ∨ break
c  in DIMACS:
-4385 -4386  4387  1075 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1075}_2 ∧ -b^{1, 1075}_1 ∧ -b^{1, 1075}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1075}_2 ∨  b^{1, 1075}_1 ∨  b^{1, 1075}_0 ∨ false 
c  in DIMACS:
-4385  4386  4387  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧ true) 
c  in CNF:
c     b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ false 
c  in DIMACS:
 4385 -4386 -4387  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1075}_2 ∧  b^{1, 1075}_1 ∧  b^{1, 1075}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1075}_2 ∨ -b^{1, 1075}_1 ∨ -b^{1, 1075}_0 ∨ false 
c  in DIMACS:
-4385 -4386 -4387  0

c i = 1076
c  -2+1 --> -1
c    ( b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧  p_1076) -> ( b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0)
c  in CNF:
c    -b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨  b^{1, 1077}_2
c    -b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_1
c    -b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨  b^{1, 1077}_0
c  in DIMACS:
-4388 -4389  4390 -1076  4391 0
-4388 -4389  4390 -1076 -4392 0
-4388 -4389  4390 -1076  4393 0

c  -1+1 --> 0
c    ( b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧  p_1076) -> (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧ -b^{1, 1077}_0)
c  in CNF:
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_2
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_1
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_0
c  in DIMACS:
-4388  4389 -4390 -1076 -4391 0
-4388  4389 -4390 -1076 -4392 0
-4388  4389 -4390 -1076 -4393 0

c  0+1 --> 1
c    (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧  p_1076) -> (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0)
c  in CNF:
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_2
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_1
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨  b^{1, 1077}_0
c  in DIMACS:
 4388  4389  4390 -1076 -4391 0
 4388  4389  4390 -1076 -4392 0
 4388  4389  4390 -1076  4393 0

c  1+1 --> 2
c    (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧  p_1076) -> (-b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0)
c  in CNF:
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_2
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨  b^{1, 1077}_1
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ -p_1076 ∨ -b^{1, 1077}_0
c  in DIMACS:
 4388  4389 -4390 -1076 -4391 0
 4388  4389 -4390 -1076  4392 0
 4388  4389 -4390 -1076 -4393 0

c  2+1 --> break 
c    (-b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧  p_1076) -> break
c  in CNF:
c     b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ -p_1076 ∨ break
c  in DIMACS:
 4388 -4389  4390 -1076 1162 0


c  2-1 --> 1
c    (-b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧ -p_1076) -> (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0)
c  in CNF:
c     b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_2
c     b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_1
c     b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨  b^{1, 1077}_0
c  in DIMACS:
 4388 -4389  4390  1076 -4391 0
 4388 -4389  4390  1076 -4392 0
 4388 -4389  4390  1076  4393 0

c  1-1 --> 0
c    (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧ -p_1076) -> (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧ -b^{1, 1077}_0)
c  in CNF:
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_2
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_1
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_0
c  in DIMACS:
 4388  4389 -4390  1076 -4391 0
 4388  4389 -4390  1076 -4392 0
 4388  4389 -4390  1076 -4393 0

c  0-1 --> -1
c    (-b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧ -p_1076) -> ( b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0)
c  in CNF:
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨  b^{1, 1077}_2
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_1
c     b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨  b^{1, 1077}_0
c  in DIMACS:
 4388  4389  4390  1076  4391 0
 4388  4389  4390  1076 -4392 0
 4388  4389  4390  1076  4393 0

c  -1-1 --> -2
c    ( b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧ -p_1076) -> ( b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0)
c  in CNF:
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨  b^{1, 1077}_2
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨  b^{1, 1077}_1
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨  p_1076 ∨ -b^{1, 1077}_0
c  in DIMACS:
-4388  4389 -4390  1076  4391 0
-4388  4389 -4390  1076  4392 0
-4388  4389 -4390  1076 -4393 0

c  -2-1 --> break 
c    ( b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧ -p_1076) -> break
c  in CNF:
c    -b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨  p_1076 ∨ break
c  in DIMACS:
-4388 -4389  4390  1076 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1076}_2 ∧ -b^{1, 1076}_1 ∧ -b^{1, 1076}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1076}_2 ∨  b^{1, 1076}_1 ∨  b^{1, 1076}_0 ∨ false 
c  in DIMACS:
-4388  4389  4390  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧ true) 
c  in CNF:
c     b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ false 
c  in DIMACS:
 4388 -4389 -4390  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1076}_2 ∧  b^{1, 1076}_1 ∧  b^{1, 1076}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1076}_2 ∨ -b^{1, 1076}_1 ∨ -b^{1, 1076}_0 ∨ false 
c  in DIMACS:
-4388 -4389 -4390  0

c i = 1077
c  -2+1 --> -1
c    ( b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧  p_1077) -> ( b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0)
c  in CNF:
c    -b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨  b^{1, 1078}_2
c    -b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_1
c    -b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨  b^{1, 1078}_0
c  in DIMACS:
-4391 -4392  4393 -1077  4394 0
-4391 -4392  4393 -1077 -4395 0
-4391 -4392  4393 -1077  4396 0

c  -1+1 --> 0
c    ( b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧  p_1077) -> (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧ -b^{1, 1078}_0)
c  in CNF:
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_2
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_1
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_0
c  in DIMACS:
-4391  4392 -4393 -1077 -4394 0
-4391  4392 -4393 -1077 -4395 0
-4391  4392 -4393 -1077 -4396 0

c  0+1 --> 1
c    (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧  p_1077) -> (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0)
c  in CNF:
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_2
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_1
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨  b^{1, 1078}_0
c  in DIMACS:
 4391  4392  4393 -1077 -4394 0
 4391  4392  4393 -1077 -4395 0
 4391  4392  4393 -1077  4396 0

c  1+1 --> 2
c    (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧  p_1077) -> (-b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0)
c  in CNF:
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_2
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨  b^{1, 1078}_1
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ -p_1077 ∨ -b^{1, 1078}_0
c  in DIMACS:
 4391  4392 -4393 -1077 -4394 0
 4391  4392 -4393 -1077  4395 0
 4391  4392 -4393 -1077 -4396 0

c  2+1 --> break 
c    (-b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧  p_1077) -> break
c  in CNF:
c     b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ -p_1077 ∨ break
c  in DIMACS:
 4391 -4392  4393 -1077 1162 0


c  2-1 --> 1
c    (-b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧ -p_1077) -> (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0)
c  in CNF:
c     b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_2
c     b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_1
c     b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨  b^{1, 1078}_0
c  in DIMACS:
 4391 -4392  4393  1077 -4394 0
 4391 -4392  4393  1077 -4395 0
 4391 -4392  4393  1077  4396 0

c  1-1 --> 0
c    (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧ -p_1077) -> (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧ -b^{1, 1078}_0)
c  in CNF:
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_2
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_1
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_0
c  in DIMACS:
 4391  4392 -4393  1077 -4394 0
 4391  4392 -4393  1077 -4395 0
 4391  4392 -4393  1077 -4396 0

c  0-1 --> -1
c    (-b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧ -p_1077) -> ( b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0)
c  in CNF:
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨  b^{1, 1078}_2
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_1
c     b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨  b^{1, 1078}_0
c  in DIMACS:
 4391  4392  4393  1077  4394 0
 4391  4392  4393  1077 -4395 0
 4391  4392  4393  1077  4396 0

c  -1-1 --> -2
c    ( b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧ -p_1077) -> ( b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0)
c  in CNF:
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨  b^{1, 1078}_2
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨  b^{1, 1078}_1
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨  p_1077 ∨ -b^{1, 1078}_0
c  in DIMACS:
-4391  4392 -4393  1077  4394 0
-4391  4392 -4393  1077  4395 0
-4391  4392 -4393  1077 -4396 0

c  -2-1 --> break 
c    ( b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧ -p_1077) -> break
c  in CNF:
c    -b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨  p_1077 ∨ break
c  in DIMACS:
-4391 -4392  4393  1077 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1077}_2 ∧ -b^{1, 1077}_1 ∧ -b^{1, 1077}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1077}_2 ∨  b^{1, 1077}_1 ∨  b^{1, 1077}_0 ∨ false 
c  in DIMACS:
-4391  4392  4393  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧ true) 
c  in CNF:
c     b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ false 
c  in DIMACS:
 4391 -4392 -4393  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1077}_2 ∧  b^{1, 1077}_1 ∧  b^{1, 1077}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1077}_2 ∨ -b^{1, 1077}_1 ∨ -b^{1, 1077}_0 ∨ false 
c  in DIMACS:
-4391 -4392 -4393  0

c i = 1078
c  -2+1 --> -1
c    ( b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧  p_1078) -> ( b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0)
c  in CNF:
c    -b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨  b^{1, 1079}_2
c    -b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_1
c    -b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨  b^{1, 1079}_0
c  in DIMACS:
-4394 -4395  4396 -1078  4397 0
-4394 -4395  4396 -1078 -4398 0
-4394 -4395  4396 -1078  4399 0

c  -1+1 --> 0
c    ( b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧  p_1078) -> (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧ -b^{1, 1079}_0)
c  in CNF:
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_2
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_1
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_0
c  in DIMACS:
-4394  4395 -4396 -1078 -4397 0
-4394  4395 -4396 -1078 -4398 0
-4394  4395 -4396 -1078 -4399 0

c  0+1 --> 1
c    (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧  p_1078) -> (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0)
c  in CNF:
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_2
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_1
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨  b^{1, 1079}_0
c  in DIMACS:
 4394  4395  4396 -1078 -4397 0
 4394  4395  4396 -1078 -4398 0
 4394  4395  4396 -1078  4399 0

c  1+1 --> 2
c    (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧  p_1078) -> (-b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0)
c  in CNF:
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_2
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨  b^{1, 1079}_1
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ -p_1078 ∨ -b^{1, 1079}_0
c  in DIMACS:
 4394  4395 -4396 -1078 -4397 0
 4394  4395 -4396 -1078  4398 0
 4394  4395 -4396 -1078 -4399 0

c  2+1 --> break 
c    (-b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 4394 -4395  4396 -1078 1162 0


c  2-1 --> 1
c    (-b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧ -p_1078) -> (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0)
c  in CNF:
c     b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_2
c     b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_1
c     b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨  b^{1, 1079}_0
c  in DIMACS:
 4394 -4395  4396  1078 -4397 0
 4394 -4395  4396  1078 -4398 0
 4394 -4395  4396  1078  4399 0

c  1-1 --> 0
c    (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧ -p_1078) -> (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧ -b^{1, 1079}_0)
c  in CNF:
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_2
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_1
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_0
c  in DIMACS:
 4394  4395 -4396  1078 -4397 0
 4394  4395 -4396  1078 -4398 0
 4394  4395 -4396  1078 -4399 0

c  0-1 --> -1
c    (-b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧ -p_1078) -> ( b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0)
c  in CNF:
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨  b^{1, 1079}_2
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_1
c     b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨  b^{1, 1079}_0
c  in DIMACS:
 4394  4395  4396  1078  4397 0
 4394  4395  4396  1078 -4398 0
 4394  4395  4396  1078  4399 0

c  -1-1 --> -2
c    ( b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧ -p_1078) -> ( b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0)
c  in CNF:
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨  b^{1, 1079}_2
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨  b^{1, 1079}_1
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨  p_1078 ∨ -b^{1, 1079}_0
c  in DIMACS:
-4394  4395 -4396  1078  4397 0
-4394  4395 -4396  1078  4398 0
-4394  4395 -4396  1078 -4399 0

c  -2-1 --> break 
c    ( b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-4394 -4395  4396  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1078}_2 ∧ -b^{1, 1078}_1 ∧ -b^{1, 1078}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1078}_2 ∨  b^{1, 1078}_1 ∨  b^{1, 1078}_0 ∨ false 
c  in DIMACS:
-4394  4395  4396  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧ true) 
c  in CNF:
c     b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ false 
c  in DIMACS:
 4394 -4395 -4396  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1078}_2 ∧  b^{1, 1078}_1 ∧  b^{1, 1078}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1078}_2 ∨ -b^{1, 1078}_1 ∨ -b^{1, 1078}_0 ∨ false 
c  in DIMACS:
-4394 -4395 -4396  0

c i = 1079
c  -2+1 --> -1
c    ( b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧  p_1079) -> ( b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0)
c  in CNF:
c    -b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨  b^{1, 1080}_2
c    -b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_1
c    -b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨  b^{1, 1080}_0
c  in DIMACS:
-4397 -4398  4399 -1079  4400 0
-4397 -4398  4399 -1079 -4401 0
-4397 -4398  4399 -1079  4402 0

c  -1+1 --> 0
c    ( b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧  p_1079) -> (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧ -b^{1, 1080}_0)
c  in CNF:
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_2
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_1
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_0
c  in DIMACS:
-4397  4398 -4399 -1079 -4400 0
-4397  4398 -4399 -1079 -4401 0
-4397  4398 -4399 -1079 -4402 0

c  0+1 --> 1
c    (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧  p_1079) -> (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0)
c  in CNF:
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_2
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_1
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨  b^{1, 1080}_0
c  in DIMACS:
 4397  4398  4399 -1079 -4400 0
 4397  4398  4399 -1079 -4401 0
 4397  4398  4399 -1079  4402 0

c  1+1 --> 2
c    (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧  p_1079) -> (-b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0)
c  in CNF:
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_2
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨  b^{1, 1080}_1
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ -p_1079 ∨ -b^{1, 1080}_0
c  in DIMACS:
 4397  4398 -4399 -1079 -4400 0
 4397  4398 -4399 -1079  4401 0
 4397  4398 -4399 -1079 -4402 0

c  2+1 --> break 
c    (-b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧  p_1079) -> break
c  in CNF:
c     b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ -p_1079 ∨ break
c  in DIMACS:
 4397 -4398  4399 -1079 1162 0


c  2-1 --> 1
c    (-b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧ -p_1079) -> (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0)
c  in CNF:
c     b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_2
c     b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_1
c     b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨  b^{1, 1080}_0
c  in DIMACS:
 4397 -4398  4399  1079 -4400 0
 4397 -4398  4399  1079 -4401 0
 4397 -4398  4399  1079  4402 0

c  1-1 --> 0
c    (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧ -p_1079) -> (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧ -b^{1, 1080}_0)
c  in CNF:
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_2
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_1
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_0
c  in DIMACS:
 4397  4398 -4399  1079 -4400 0
 4397  4398 -4399  1079 -4401 0
 4397  4398 -4399  1079 -4402 0

c  0-1 --> -1
c    (-b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧ -p_1079) -> ( b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0)
c  in CNF:
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨  b^{1, 1080}_2
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_1
c     b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨  b^{1, 1080}_0
c  in DIMACS:
 4397  4398  4399  1079  4400 0
 4397  4398  4399  1079 -4401 0
 4397  4398  4399  1079  4402 0

c  -1-1 --> -2
c    ( b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧ -p_1079) -> ( b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0)
c  in CNF:
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨  b^{1, 1080}_2
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨  b^{1, 1080}_1
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨  p_1079 ∨ -b^{1, 1080}_0
c  in DIMACS:
-4397  4398 -4399  1079  4400 0
-4397  4398 -4399  1079  4401 0
-4397  4398 -4399  1079 -4402 0

c  -2-1 --> break 
c    ( b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧ -p_1079) -> break
c  in CNF:
c    -b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨  p_1079 ∨ break
c  in DIMACS:
-4397 -4398  4399  1079 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1079}_2 ∧ -b^{1, 1079}_1 ∧ -b^{1, 1079}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1079}_2 ∨  b^{1, 1079}_1 ∨  b^{1, 1079}_0 ∨ false 
c  in DIMACS:
-4397  4398  4399  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧ true) 
c  in CNF:
c     b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ false 
c  in DIMACS:
 4397 -4398 -4399  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1079}_2 ∧  b^{1, 1079}_1 ∧  b^{1, 1079}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1079}_2 ∨ -b^{1, 1079}_1 ∨ -b^{1, 1079}_0 ∨ false 
c  in DIMACS:
-4397 -4398 -4399  0

c i = 1080
c  -2+1 --> -1
c    ( b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧  p_1080) -> ( b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0)
c  in CNF:
c    -b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨  b^{1, 1081}_2
c    -b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_1
c    -b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨  b^{1, 1081}_0
c  in DIMACS:
-4400 -4401  4402 -1080  4403 0
-4400 -4401  4402 -1080 -4404 0
-4400 -4401  4402 -1080  4405 0

c  -1+1 --> 0
c    ( b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧  p_1080) -> (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧ -b^{1, 1081}_0)
c  in CNF:
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_2
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_1
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_0
c  in DIMACS:
-4400  4401 -4402 -1080 -4403 0
-4400  4401 -4402 -1080 -4404 0
-4400  4401 -4402 -1080 -4405 0

c  0+1 --> 1
c    (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧  p_1080) -> (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0)
c  in CNF:
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_2
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_1
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨  b^{1, 1081}_0
c  in DIMACS:
 4400  4401  4402 -1080 -4403 0
 4400  4401  4402 -1080 -4404 0
 4400  4401  4402 -1080  4405 0

c  1+1 --> 2
c    (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧  p_1080) -> (-b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0)
c  in CNF:
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_2
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨  b^{1, 1081}_1
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ -p_1080 ∨ -b^{1, 1081}_0
c  in DIMACS:
 4400  4401 -4402 -1080 -4403 0
 4400  4401 -4402 -1080  4404 0
 4400  4401 -4402 -1080 -4405 0

c  2+1 --> break 
c    (-b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 4400 -4401  4402 -1080 1162 0


c  2-1 --> 1
c    (-b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧ -p_1080) -> (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0)
c  in CNF:
c     b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_2
c     b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_1
c     b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨  b^{1, 1081}_0
c  in DIMACS:
 4400 -4401  4402  1080 -4403 0
 4400 -4401  4402  1080 -4404 0
 4400 -4401  4402  1080  4405 0

c  1-1 --> 0
c    (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧ -p_1080) -> (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧ -b^{1, 1081}_0)
c  in CNF:
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_2
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_1
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_0
c  in DIMACS:
 4400  4401 -4402  1080 -4403 0
 4400  4401 -4402  1080 -4404 0
 4400  4401 -4402  1080 -4405 0

c  0-1 --> -1
c    (-b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧ -p_1080) -> ( b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0)
c  in CNF:
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨  b^{1, 1081}_2
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_1
c     b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨  b^{1, 1081}_0
c  in DIMACS:
 4400  4401  4402  1080  4403 0
 4400  4401  4402  1080 -4404 0
 4400  4401  4402  1080  4405 0

c  -1-1 --> -2
c    ( b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧ -p_1080) -> ( b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0)
c  in CNF:
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨  b^{1, 1081}_2
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨  b^{1, 1081}_1
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨  p_1080 ∨ -b^{1, 1081}_0
c  in DIMACS:
-4400  4401 -4402  1080  4403 0
-4400  4401 -4402  1080  4404 0
-4400  4401 -4402  1080 -4405 0

c  -2-1 --> break 
c    ( b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-4400 -4401  4402  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1080}_2 ∧ -b^{1, 1080}_1 ∧ -b^{1, 1080}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1080}_2 ∨  b^{1, 1080}_1 ∨  b^{1, 1080}_0 ∨ false 
c  in DIMACS:
-4400  4401  4402  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧ true) 
c  in CNF:
c     b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ false 
c  in DIMACS:
 4400 -4401 -4402  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1080}_2 ∧  b^{1, 1080}_1 ∧  b^{1, 1080}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1080}_2 ∨ -b^{1, 1080}_1 ∨ -b^{1, 1080}_0 ∨ false 
c  in DIMACS:
-4400 -4401 -4402  0

c i = 1081
c  -2+1 --> -1
c    ( b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧  p_1081) -> ( b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0)
c  in CNF:
c    -b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨  b^{1, 1082}_2
c    -b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_1
c    -b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨  b^{1, 1082}_0
c  in DIMACS:
-4403 -4404  4405 -1081  4406 0
-4403 -4404  4405 -1081 -4407 0
-4403 -4404  4405 -1081  4408 0

c  -1+1 --> 0
c    ( b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧  p_1081) -> (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧ -b^{1, 1082}_0)
c  in CNF:
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_2
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_1
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_0
c  in DIMACS:
-4403  4404 -4405 -1081 -4406 0
-4403  4404 -4405 -1081 -4407 0
-4403  4404 -4405 -1081 -4408 0

c  0+1 --> 1
c    (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧  p_1081) -> (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0)
c  in CNF:
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_2
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_1
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨  b^{1, 1082}_0
c  in DIMACS:
 4403  4404  4405 -1081 -4406 0
 4403  4404  4405 -1081 -4407 0
 4403  4404  4405 -1081  4408 0

c  1+1 --> 2
c    (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧  p_1081) -> (-b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0)
c  in CNF:
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_2
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨  b^{1, 1082}_1
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ -p_1081 ∨ -b^{1, 1082}_0
c  in DIMACS:
 4403  4404 -4405 -1081 -4406 0
 4403  4404 -4405 -1081  4407 0
 4403  4404 -4405 -1081 -4408 0

c  2+1 --> break 
c    (-b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧  p_1081) -> break
c  in CNF:
c     b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ -p_1081 ∨ break
c  in DIMACS:
 4403 -4404  4405 -1081 1162 0


c  2-1 --> 1
c    (-b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧ -p_1081) -> (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0)
c  in CNF:
c     b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_2
c     b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_1
c     b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨  b^{1, 1082}_0
c  in DIMACS:
 4403 -4404  4405  1081 -4406 0
 4403 -4404  4405  1081 -4407 0
 4403 -4404  4405  1081  4408 0

c  1-1 --> 0
c    (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧ -p_1081) -> (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧ -b^{1, 1082}_0)
c  in CNF:
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_2
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_1
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_0
c  in DIMACS:
 4403  4404 -4405  1081 -4406 0
 4403  4404 -4405  1081 -4407 0
 4403  4404 -4405  1081 -4408 0

c  0-1 --> -1
c    (-b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧ -p_1081) -> ( b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0)
c  in CNF:
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨  b^{1, 1082}_2
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_1
c     b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨  b^{1, 1082}_0
c  in DIMACS:
 4403  4404  4405  1081  4406 0
 4403  4404  4405  1081 -4407 0
 4403  4404  4405  1081  4408 0

c  -1-1 --> -2
c    ( b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧ -p_1081) -> ( b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0)
c  in CNF:
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨  b^{1, 1082}_2
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨  b^{1, 1082}_1
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨  p_1081 ∨ -b^{1, 1082}_0
c  in DIMACS:
-4403  4404 -4405  1081  4406 0
-4403  4404 -4405  1081  4407 0
-4403  4404 -4405  1081 -4408 0

c  -2-1 --> break 
c    ( b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧ -p_1081) -> break
c  in CNF:
c    -b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨  p_1081 ∨ break
c  in DIMACS:
-4403 -4404  4405  1081 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1081}_2 ∧ -b^{1, 1081}_1 ∧ -b^{1, 1081}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1081}_2 ∨  b^{1, 1081}_1 ∨  b^{1, 1081}_0 ∨ false 
c  in DIMACS:
-4403  4404  4405  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧ true) 
c  in CNF:
c     b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ false 
c  in DIMACS:
 4403 -4404 -4405  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1081}_2 ∧  b^{1, 1081}_1 ∧  b^{1, 1081}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1081}_2 ∨ -b^{1, 1081}_1 ∨ -b^{1, 1081}_0 ∨ false 
c  in DIMACS:
-4403 -4404 -4405  0

c i = 1082
c  -2+1 --> -1
c    ( b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧  p_1082) -> ( b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0)
c  in CNF:
c    -b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨  b^{1, 1083}_2
c    -b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_1
c    -b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨  b^{1, 1083}_0
c  in DIMACS:
-4406 -4407  4408 -1082  4409 0
-4406 -4407  4408 -1082 -4410 0
-4406 -4407  4408 -1082  4411 0

c  -1+1 --> 0
c    ( b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧  p_1082) -> (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧ -b^{1, 1083}_0)
c  in CNF:
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_2
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_1
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_0
c  in DIMACS:
-4406  4407 -4408 -1082 -4409 0
-4406  4407 -4408 -1082 -4410 0
-4406  4407 -4408 -1082 -4411 0

c  0+1 --> 1
c    (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧  p_1082) -> (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0)
c  in CNF:
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_2
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_1
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨  b^{1, 1083}_0
c  in DIMACS:
 4406  4407  4408 -1082 -4409 0
 4406  4407  4408 -1082 -4410 0
 4406  4407  4408 -1082  4411 0

c  1+1 --> 2
c    (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧  p_1082) -> (-b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0)
c  in CNF:
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_2
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨  b^{1, 1083}_1
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ -p_1082 ∨ -b^{1, 1083}_0
c  in DIMACS:
 4406  4407 -4408 -1082 -4409 0
 4406  4407 -4408 -1082  4410 0
 4406  4407 -4408 -1082 -4411 0

c  2+1 --> break 
c    (-b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧  p_1082) -> break
c  in CNF:
c     b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ -p_1082 ∨ break
c  in DIMACS:
 4406 -4407  4408 -1082 1162 0


c  2-1 --> 1
c    (-b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧ -p_1082) -> (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0)
c  in CNF:
c     b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_2
c     b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_1
c     b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨  b^{1, 1083}_0
c  in DIMACS:
 4406 -4407  4408  1082 -4409 0
 4406 -4407  4408  1082 -4410 0
 4406 -4407  4408  1082  4411 0

c  1-1 --> 0
c    (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧ -p_1082) -> (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧ -b^{1, 1083}_0)
c  in CNF:
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_2
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_1
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_0
c  in DIMACS:
 4406  4407 -4408  1082 -4409 0
 4406  4407 -4408  1082 -4410 0
 4406  4407 -4408  1082 -4411 0

c  0-1 --> -1
c    (-b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧ -p_1082) -> ( b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0)
c  in CNF:
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨  b^{1, 1083}_2
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_1
c     b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨  b^{1, 1083}_0
c  in DIMACS:
 4406  4407  4408  1082  4409 0
 4406  4407  4408  1082 -4410 0
 4406  4407  4408  1082  4411 0

c  -1-1 --> -2
c    ( b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧ -p_1082) -> ( b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0)
c  in CNF:
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨  b^{1, 1083}_2
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨  b^{1, 1083}_1
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨  p_1082 ∨ -b^{1, 1083}_0
c  in DIMACS:
-4406  4407 -4408  1082  4409 0
-4406  4407 -4408  1082  4410 0
-4406  4407 -4408  1082 -4411 0

c  -2-1 --> break 
c    ( b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧ -p_1082) -> break
c  in CNF:
c    -b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨  p_1082 ∨ break
c  in DIMACS:
-4406 -4407  4408  1082 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1082}_2 ∧ -b^{1, 1082}_1 ∧ -b^{1, 1082}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1082}_2 ∨  b^{1, 1082}_1 ∨  b^{1, 1082}_0 ∨ false 
c  in DIMACS:
-4406  4407  4408  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧ true) 
c  in CNF:
c     b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ false 
c  in DIMACS:
 4406 -4407 -4408  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1082}_2 ∧  b^{1, 1082}_1 ∧  b^{1, 1082}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1082}_2 ∨ -b^{1, 1082}_1 ∨ -b^{1, 1082}_0 ∨ false 
c  in DIMACS:
-4406 -4407 -4408  0

c i = 1083
c  -2+1 --> -1
c    ( b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧  p_1083) -> ( b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0)
c  in CNF:
c    -b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨  b^{1, 1084}_2
c    -b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_1
c    -b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨  b^{1, 1084}_0
c  in DIMACS:
-4409 -4410  4411 -1083  4412 0
-4409 -4410  4411 -1083 -4413 0
-4409 -4410  4411 -1083  4414 0

c  -1+1 --> 0
c    ( b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧  p_1083) -> (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧ -b^{1, 1084}_0)
c  in CNF:
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_2
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_1
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_0
c  in DIMACS:
-4409  4410 -4411 -1083 -4412 0
-4409  4410 -4411 -1083 -4413 0
-4409  4410 -4411 -1083 -4414 0

c  0+1 --> 1
c    (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧  p_1083) -> (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0)
c  in CNF:
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_2
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_1
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨  b^{1, 1084}_0
c  in DIMACS:
 4409  4410  4411 -1083 -4412 0
 4409  4410  4411 -1083 -4413 0
 4409  4410  4411 -1083  4414 0

c  1+1 --> 2
c    (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧  p_1083) -> (-b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0)
c  in CNF:
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_2
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨  b^{1, 1084}_1
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ -p_1083 ∨ -b^{1, 1084}_0
c  in DIMACS:
 4409  4410 -4411 -1083 -4412 0
 4409  4410 -4411 -1083  4413 0
 4409  4410 -4411 -1083 -4414 0

c  2+1 --> break 
c    (-b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧  p_1083) -> break
c  in CNF:
c     b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ -p_1083 ∨ break
c  in DIMACS:
 4409 -4410  4411 -1083 1162 0


c  2-1 --> 1
c    (-b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧ -p_1083) -> (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0)
c  in CNF:
c     b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_2
c     b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_1
c     b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨  b^{1, 1084}_0
c  in DIMACS:
 4409 -4410  4411  1083 -4412 0
 4409 -4410  4411  1083 -4413 0
 4409 -4410  4411  1083  4414 0

c  1-1 --> 0
c    (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧ -p_1083) -> (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧ -b^{1, 1084}_0)
c  in CNF:
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_2
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_1
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_0
c  in DIMACS:
 4409  4410 -4411  1083 -4412 0
 4409  4410 -4411  1083 -4413 0
 4409  4410 -4411  1083 -4414 0

c  0-1 --> -1
c    (-b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧ -p_1083) -> ( b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0)
c  in CNF:
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨  b^{1, 1084}_2
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_1
c     b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨  b^{1, 1084}_0
c  in DIMACS:
 4409  4410  4411  1083  4412 0
 4409  4410  4411  1083 -4413 0
 4409  4410  4411  1083  4414 0

c  -1-1 --> -2
c    ( b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧ -p_1083) -> ( b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0)
c  in CNF:
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨  b^{1, 1084}_2
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨  b^{1, 1084}_1
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨  p_1083 ∨ -b^{1, 1084}_0
c  in DIMACS:
-4409  4410 -4411  1083  4412 0
-4409  4410 -4411  1083  4413 0
-4409  4410 -4411  1083 -4414 0

c  -2-1 --> break 
c    ( b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧ -p_1083) -> break
c  in CNF:
c    -b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨  p_1083 ∨ break
c  in DIMACS:
-4409 -4410  4411  1083 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1083}_2 ∧ -b^{1, 1083}_1 ∧ -b^{1, 1083}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1083}_2 ∨  b^{1, 1083}_1 ∨  b^{1, 1083}_0 ∨ false 
c  in DIMACS:
-4409  4410  4411  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧ true) 
c  in CNF:
c     b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ false 
c  in DIMACS:
 4409 -4410 -4411  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1083}_2 ∧  b^{1, 1083}_1 ∧  b^{1, 1083}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1083}_2 ∨ -b^{1, 1083}_1 ∨ -b^{1, 1083}_0 ∨ false 
c  in DIMACS:
-4409 -4410 -4411  0

c i = 1084
c  -2+1 --> -1
c    ( b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧  p_1084) -> ( b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0)
c  in CNF:
c    -b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨  b^{1, 1085}_2
c    -b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_1
c    -b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨  b^{1, 1085}_0
c  in DIMACS:
-4412 -4413  4414 -1084  4415 0
-4412 -4413  4414 -1084 -4416 0
-4412 -4413  4414 -1084  4417 0

c  -1+1 --> 0
c    ( b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧  p_1084) -> (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧ -b^{1, 1085}_0)
c  in CNF:
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_2
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_1
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_0
c  in DIMACS:
-4412  4413 -4414 -1084 -4415 0
-4412  4413 -4414 -1084 -4416 0
-4412  4413 -4414 -1084 -4417 0

c  0+1 --> 1
c    (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧  p_1084) -> (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0)
c  in CNF:
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_2
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_1
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨  b^{1, 1085}_0
c  in DIMACS:
 4412  4413  4414 -1084 -4415 0
 4412  4413  4414 -1084 -4416 0
 4412  4413  4414 -1084  4417 0

c  1+1 --> 2
c    (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧  p_1084) -> (-b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0)
c  in CNF:
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_2
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨  b^{1, 1085}_1
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ -p_1084 ∨ -b^{1, 1085}_0
c  in DIMACS:
 4412  4413 -4414 -1084 -4415 0
 4412  4413 -4414 -1084  4416 0
 4412  4413 -4414 -1084 -4417 0

c  2+1 --> break 
c    (-b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧  p_1084) -> break
c  in CNF:
c     b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ -p_1084 ∨ break
c  in DIMACS:
 4412 -4413  4414 -1084 1162 0


c  2-1 --> 1
c    (-b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧ -p_1084) -> (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0)
c  in CNF:
c     b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_2
c     b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_1
c     b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨  b^{1, 1085}_0
c  in DIMACS:
 4412 -4413  4414  1084 -4415 0
 4412 -4413  4414  1084 -4416 0
 4412 -4413  4414  1084  4417 0

c  1-1 --> 0
c    (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧ -p_1084) -> (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧ -b^{1, 1085}_0)
c  in CNF:
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_2
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_1
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_0
c  in DIMACS:
 4412  4413 -4414  1084 -4415 0
 4412  4413 -4414  1084 -4416 0
 4412  4413 -4414  1084 -4417 0

c  0-1 --> -1
c    (-b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧ -p_1084) -> ( b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0)
c  in CNF:
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨  b^{1, 1085}_2
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_1
c     b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨  b^{1, 1085}_0
c  in DIMACS:
 4412  4413  4414  1084  4415 0
 4412  4413  4414  1084 -4416 0
 4412  4413  4414  1084  4417 0

c  -1-1 --> -2
c    ( b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧ -p_1084) -> ( b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0)
c  in CNF:
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨  b^{1, 1085}_2
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨  b^{1, 1085}_1
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨  p_1084 ∨ -b^{1, 1085}_0
c  in DIMACS:
-4412  4413 -4414  1084  4415 0
-4412  4413 -4414  1084  4416 0
-4412  4413 -4414  1084 -4417 0

c  -2-1 --> break 
c    ( b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧ -p_1084) -> break
c  in CNF:
c    -b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨  p_1084 ∨ break
c  in DIMACS:
-4412 -4413  4414  1084 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1084}_2 ∧ -b^{1, 1084}_1 ∧ -b^{1, 1084}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1084}_2 ∨  b^{1, 1084}_1 ∨  b^{1, 1084}_0 ∨ false 
c  in DIMACS:
-4412  4413  4414  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧ true) 
c  in CNF:
c     b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ false 
c  in DIMACS:
 4412 -4413 -4414  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1084}_2 ∧  b^{1, 1084}_1 ∧  b^{1, 1084}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1084}_2 ∨ -b^{1, 1084}_1 ∨ -b^{1, 1084}_0 ∨ false 
c  in DIMACS:
-4412 -4413 -4414  0

c i = 1085
c  -2+1 --> -1
c    ( b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧  p_1085) -> ( b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0)
c  in CNF:
c    -b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨  b^{1, 1086}_2
c    -b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_1
c    -b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨  b^{1, 1086}_0
c  in DIMACS:
-4415 -4416  4417 -1085  4418 0
-4415 -4416  4417 -1085 -4419 0
-4415 -4416  4417 -1085  4420 0

c  -1+1 --> 0
c    ( b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧  p_1085) -> (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧ -b^{1, 1086}_0)
c  in CNF:
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_2
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_1
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_0
c  in DIMACS:
-4415  4416 -4417 -1085 -4418 0
-4415  4416 -4417 -1085 -4419 0
-4415  4416 -4417 -1085 -4420 0

c  0+1 --> 1
c    (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧  p_1085) -> (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0)
c  in CNF:
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_2
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_1
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨  b^{1, 1086}_0
c  in DIMACS:
 4415  4416  4417 -1085 -4418 0
 4415  4416  4417 -1085 -4419 0
 4415  4416  4417 -1085  4420 0

c  1+1 --> 2
c    (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧  p_1085) -> (-b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0)
c  in CNF:
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_2
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨  b^{1, 1086}_1
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ -p_1085 ∨ -b^{1, 1086}_0
c  in DIMACS:
 4415  4416 -4417 -1085 -4418 0
 4415  4416 -4417 -1085  4419 0
 4415  4416 -4417 -1085 -4420 0

c  2+1 --> break 
c    (-b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 4415 -4416  4417 -1085 1162 0


c  2-1 --> 1
c    (-b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧ -p_1085) -> (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0)
c  in CNF:
c     b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_2
c     b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_1
c     b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨  b^{1, 1086}_0
c  in DIMACS:
 4415 -4416  4417  1085 -4418 0
 4415 -4416  4417  1085 -4419 0
 4415 -4416  4417  1085  4420 0

c  1-1 --> 0
c    (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧ -p_1085) -> (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧ -b^{1, 1086}_0)
c  in CNF:
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_2
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_1
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_0
c  in DIMACS:
 4415  4416 -4417  1085 -4418 0
 4415  4416 -4417  1085 -4419 0
 4415  4416 -4417  1085 -4420 0

c  0-1 --> -1
c    (-b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧ -p_1085) -> ( b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0)
c  in CNF:
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨  b^{1, 1086}_2
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_1
c     b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨  b^{1, 1086}_0
c  in DIMACS:
 4415  4416  4417  1085  4418 0
 4415  4416  4417  1085 -4419 0
 4415  4416  4417  1085  4420 0

c  -1-1 --> -2
c    ( b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧ -p_1085) -> ( b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0)
c  in CNF:
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨  b^{1, 1086}_2
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨  b^{1, 1086}_1
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨  p_1085 ∨ -b^{1, 1086}_0
c  in DIMACS:
-4415  4416 -4417  1085  4418 0
-4415  4416 -4417  1085  4419 0
-4415  4416 -4417  1085 -4420 0

c  -2-1 --> break 
c    ( b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-4415 -4416  4417  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1085}_2 ∧ -b^{1, 1085}_1 ∧ -b^{1, 1085}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1085}_2 ∨  b^{1, 1085}_1 ∨  b^{1, 1085}_0 ∨ false 
c  in DIMACS:
-4415  4416  4417  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧ true) 
c  in CNF:
c     b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ false 
c  in DIMACS:
 4415 -4416 -4417  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1085}_2 ∧  b^{1, 1085}_1 ∧  b^{1, 1085}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1085}_2 ∨ -b^{1, 1085}_1 ∨ -b^{1, 1085}_0 ∨ false 
c  in DIMACS:
-4415 -4416 -4417  0

c i = 1086
c  -2+1 --> -1
c    ( b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧  p_1086) -> ( b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0)
c  in CNF:
c    -b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨  b^{1, 1087}_2
c    -b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_1
c    -b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨  b^{1, 1087}_0
c  in DIMACS:
-4418 -4419  4420 -1086  4421 0
-4418 -4419  4420 -1086 -4422 0
-4418 -4419  4420 -1086  4423 0

c  -1+1 --> 0
c    ( b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧  p_1086) -> (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧ -b^{1, 1087}_0)
c  in CNF:
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_2
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_1
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_0
c  in DIMACS:
-4418  4419 -4420 -1086 -4421 0
-4418  4419 -4420 -1086 -4422 0
-4418  4419 -4420 -1086 -4423 0

c  0+1 --> 1
c    (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧  p_1086) -> (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0)
c  in CNF:
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_2
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_1
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨  b^{1, 1087}_0
c  in DIMACS:
 4418  4419  4420 -1086 -4421 0
 4418  4419  4420 -1086 -4422 0
 4418  4419  4420 -1086  4423 0

c  1+1 --> 2
c    (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧  p_1086) -> (-b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0)
c  in CNF:
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_2
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨  b^{1, 1087}_1
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ -p_1086 ∨ -b^{1, 1087}_0
c  in DIMACS:
 4418  4419 -4420 -1086 -4421 0
 4418  4419 -4420 -1086  4422 0
 4418  4419 -4420 -1086 -4423 0

c  2+1 --> break 
c    (-b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 4418 -4419  4420 -1086 1162 0


c  2-1 --> 1
c    (-b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧ -p_1086) -> (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0)
c  in CNF:
c     b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_2
c     b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_1
c     b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨  b^{1, 1087}_0
c  in DIMACS:
 4418 -4419  4420  1086 -4421 0
 4418 -4419  4420  1086 -4422 0
 4418 -4419  4420  1086  4423 0

c  1-1 --> 0
c    (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧ -p_1086) -> (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧ -b^{1, 1087}_0)
c  in CNF:
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_2
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_1
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_0
c  in DIMACS:
 4418  4419 -4420  1086 -4421 0
 4418  4419 -4420  1086 -4422 0
 4418  4419 -4420  1086 -4423 0

c  0-1 --> -1
c    (-b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧ -p_1086) -> ( b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0)
c  in CNF:
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨  b^{1, 1087}_2
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_1
c     b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨  b^{1, 1087}_0
c  in DIMACS:
 4418  4419  4420  1086  4421 0
 4418  4419  4420  1086 -4422 0
 4418  4419  4420  1086  4423 0

c  -1-1 --> -2
c    ( b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧ -p_1086) -> ( b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0)
c  in CNF:
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨  b^{1, 1087}_2
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨  b^{1, 1087}_1
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨  p_1086 ∨ -b^{1, 1087}_0
c  in DIMACS:
-4418  4419 -4420  1086  4421 0
-4418  4419 -4420  1086  4422 0
-4418  4419 -4420  1086 -4423 0

c  -2-1 --> break 
c    ( b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-4418 -4419  4420  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1086}_2 ∧ -b^{1, 1086}_1 ∧ -b^{1, 1086}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1086}_2 ∨  b^{1, 1086}_1 ∨  b^{1, 1086}_0 ∨ false 
c  in DIMACS:
-4418  4419  4420  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧ true) 
c  in CNF:
c     b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ false 
c  in DIMACS:
 4418 -4419 -4420  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1086}_2 ∧  b^{1, 1086}_1 ∧  b^{1, 1086}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1086}_2 ∨ -b^{1, 1086}_1 ∨ -b^{1, 1086}_0 ∨ false 
c  in DIMACS:
-4418 -4419 -4420  0

c i = 1087
c  -2+1 --> -1
c    ( b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧  p_1087) -> ( b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0)
c  in CNF:
c    -b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨  b^{1, 1088}_2
c    -b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_1
c    -b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨  b^{1, 1088}_0
c  in DIMACS:
-4421 -4422  4423 -1087  4424 0
-4421 -4422  4423 -1087 -4425 0
-4421 -4422  4423 -1087  4426 0

c  -1+1 --> 0
c    ( b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧  p_1087) -> (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧ -b^{1, 1088}_0)
c  in CNF:
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_2
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_1
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_0
c  in DIMACS:
-4421  4422 -4423 -1087 -4424 0
-4421  4422 -4423 -1087 -4425 0
-4421  4422 -4423 -1087 -4426 0

c  0+1 --> 1
c    (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧  p_1087) -> (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0)
c  in CNF:
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_2
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_1
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨  b^{1, 1088}_0
c  in DIMACS:
 4421  4422  4423 -1087 -4424 0
 4421  4422  4423 -1087 -4425 0
 4421  4422  4423 -1087  4426 0

c  1+1 --> 2
c    (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧  p_1087) -> (-b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0)
c  in CNF:
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_2
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨  b^{1, 1088}_1
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ -p_1087 ∨ -b^{1, 1088}_0
c  in DIMACS:
 4421  4422 -4423 -1087 -4424 0
 4421  4422 -4423 -1087  4425 0
 4421  4422 -4423 -1087 -4426 0

c  2+1 --> break 
c    (-b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧  p_1087) -> break
c  in CNF:
c     b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ -p_1087 ∨ break
c  in DIMACS:
 4421 -4422  4423 -1087 1162 0


c  2-1 --> 1
c    (-b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧ -p_1087) -> (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0)
c  in CNF:
c     b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_2
c     b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_1
c     b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨  b^{1, 1088}_0
c  in DIMACS:
 4421 -4422  4423  1087 -4424 0
 4421 -4422  4423  1087 -4425 0
 4421 -4422  4423  1087  4426 0

c  1-1 --> 0
c    (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧ -p_1087) -> (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧ -b^{1, 1088}_0)
c  in CNF:
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_2
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_1
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_0
c  in DIMACS:
 4421  4422 -4423  1087 -4424 0
 4421  4422 -4423  1087 -4425 0
 4421  4422 -4423  1087 -4426 0

c  0-1 --> -1
c    (-b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧ -p_1087) -> ( b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0)
c  in CNF:
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨  b^{1, 1088}_2
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_1
c     b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨  b^{1, 1088}_0
c  in DIMACS:
 4421  4422  4423  1087  4424 0
 4421  4422  4423  1087 -4425 0
 4421  4422  4423  1087  4426 0

c  -1-1 --> -2
c    ( b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧ -p_1087) -> ( b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0)
c  in CNF:
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨  b^{1, 1088}_2
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨  b^{1, 1088}_1
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨  p_1087 ∨ -b^{1, 1088}_0
c  in DIMACS:
-4421  4422 -4423  1087  4424 0
-4421  4422 -4423  1087  4425 0
-4421  4422 -4423  1087 -4426 0

c  -2-1 --> break 
c    ( b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧ -p_1087) -> break
c  in CNF:
c    -b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨  p_1087 ∨ break
c  in DIMACS:
-4421 -4422  4423  1087 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1087}_2 ∧ -b^{1, 1087}_1 ∧ -b^{1, 1087}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1087}_2 ∨  b^{1, 1087}_1 ∨  b^{1, 1087}_0 ∨ false 
c  in DIMACS:
-4421  4422  4423  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧ true) 
c  in CNF:
c     b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ false 
c  in DIMACS:
 4421 -4422 -4423  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1087}_2 ∧  b^{1, 1087}_1 ∧  b^{1, 1087}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1087}_2 ∨ -b^{1, 1087}_1 ∨ -b^{1, 1087}_0 ∨ false 
c  in DIMACS:
-4421 -4422 -4423  0

c i = 1088
c  -2+1 --> -1
c    ( b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧  p_1088) -> ( b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0)
c  in CNF:
c    -b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨  b^{1, 1089}_2
c    -b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_1
c    -b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨  b^{1, 1089}_0
c  in DIMACS:
-4424 -4425  4426 -1088  4427 0
-4424 -4425  4426 -1088 -4428 0
-4424 -4425  4426 -1088  4429 0

c  -1+1 --> 0
c    ( b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧  p_1088) -> (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧ -b^{1, 1089}_0)
c  in CNF:
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_2
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_1
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_0
c  in DIMACS:
-4424  4425 -4426 -1088 -4427 0
-4424  4425 -4426 -1088 -4428 0
-4424  4425 -4426 -1088 -4429 0

c  0+1 --> 1
c    (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧  p_1088) -> (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0)
c  in CNF:
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_2
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_1
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨  b^{1, 1089}_0
c  in DIMACS:
 4424  4425  4426 -1088 -4427 0
 4424  4425  4426 -1088 -4428 0
 4424  4425  4426 -1088  4429 0

c  1+1 --> 2
c    (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧  p_1088) -> (-b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0)
c  in CNF:
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_2
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨  b^{1, 1089}_1
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ -p_1088 ∨ -b^{1, 1089}_0
c  in DIMACS:
 4424  4425 -4426 -1088 -4427 0
 4424  4425 -4426 -1088  4428 0
 4424  4425 -4426 -1088 -4429 0

c  2+1 --> break 
c    (-b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 4424 -4425  4426 -1088 1162 0


c  2-1 --> 1
c    (-b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧ -p_1088) -> (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0)
c  in CNF:
c     b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_2
c     b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_1
c     b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨  b^{1, 1089}_0
c  in DIMACS:
 4424 -4425  4426  1088 -4427 0
 4424 -4425  4426  1088 -4428 0
 4424 -4425  4426  1088  4429 0

c  1-1 --> 0
c    (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧ -p_1088) -> (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧ -b^{1, 1089}_0)
c  in CNF:
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_2
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_1
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_0
c  in DIMACS:
 4424  4425 -4426  1088 -4427 0
 4424  4425 -4426  1088 -4428 0
 4424  4425 -4426  1088 -4429 0

c  0-1 --> -1
c    (-b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧ -p_1088) -> ( b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0)
c  in CNF:
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨  b^{1, 1089}_2
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_1
c     b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨  b^{1, 1089}_0
c  in DIMACS:
 4424  4425  4426  1088  4427 0
 4424  4425  4426  1088 -4428 0
 4424  4425  4426  1088  4429 0

c  -1-1 --> -2
c    ( b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧ -p_1088) -> ( b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0)
c  in CNF:
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨  b^{1, 1089}_2
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨  b^{1, 1089}_1
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨  p_1088 ∨ -b^{1, 1089}_0
c  in DIMACS:
-4424  4425 -4426  1088  4427 0
-4424  4425 -4426  1088  4428 0
-4424  4425 -4426  1088 -4429 0

c  -2-1 --> break 
c    ( b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-4424 -4425  4426  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1088}_2 ∧ -b^{1, 1088}_1 ∧ -b^{1, 1088}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1088}_2 ∨  b^{1, 1088}_1 ∨  b^{1, 1088}_0 ∨ false 
c  in DIMACS:
-4424  4425  4426  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧ true) 
c  in CNF:
c     b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ false 
c  in DIMACS:
 4424 -4425 -4426  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1088}_2 ∧  b^{1, 1088}_1 ∧  b^{1, 1088}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1088}_2 ∨ -b^{1, 1088}_1 ∨ -b^{1, 1088}_0 ∨ false 
c  in DIMACS:
-4424 -4425 -4426  0

c i = 1089
c  -2+1 --> -1
c    ( b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧  p_1089) -> ( b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0)
c  in CNF:
c    -b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨  b^{1, 1090}_2
c    -b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_1
c    -b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨  b^{1, 1090}_0
c  in DIMACS:
-4427 -4428  4429 -1089  4430 0
-4427 -4428  4429 -1089 -4431 0
-4427 -4428  4429 -1089  4432 0

c  -1+1 --> 0
c    ( b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧  p_1089) -> (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧ -b^{1, 1090}_0)
c  in CNF:
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_2
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_1
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_0
c  in DIMACS:
-4427  4428 -4429 -1089 -4430 0
-4427  4428 -4429 -1089 -4431 0
-4427  4428 -4429 -1089 -4432 0

c  0+1 --> 1
c    (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧  p_1089) -> (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0)
c  in CNF:
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_2
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_1
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨  b^{1, 1090}_0
c  in DIMACS:
 4427  4428  4429 -1089 -4430 0
 4427  4428  4429 -1089 -4431 0
 4427  4428  4429 -1089  4432 0

c  1+1 --> 2
c    (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧  p_1089) -> (-b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0)
c  in CNF:
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_2
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨  b^{1, 1090}_1
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ -p_1089 ∨ -b^{1, 1090}_0
c  in DIMACS:
 4427  4428 -4429 -1089 -4430 0
 4427  4428 -4429 -1089  4431 0
 4427  4428 -4429 -1089 -4432 0

c  2+1 --> break 
c    (-b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 4427 -4428  4429 -1089 1162 0


c  2-1 --> 1
c    (-b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧ -p_1089) -> (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0)
c  in CNF:
c     b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_2
c     b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_1
c     b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨  b^{1, 1090}_0
c  in DIMACS:
 4427 -4428  4429  1089 -4430 0
 4427 -4428  4429  1089 -4431 0
 4427 -4428  4429  1089  4432 0

c  1-1 --> 0
c    (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧ -p_1089) -> (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧ -b^{1, 1090}_0)
c  in CNF:
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_2
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_1
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_0
c  in DIMACS:
 4427  4428 -4429  1089 -4430 0
 4427  4428 -4429  1089 -4431 0
 4427  4428 -4429  1089 -4432 0

c  0-1 --> -1
c    (-b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧ -p_1089) -> ( b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0)
c  in CNF:
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨  b^{1, 1090}_2
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_1
c     b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨  b^{1, 1090}_0
c  in DIMACS:
 4427  4428  4429  1089  4430 0
 4427  4428  4429  1089 -4431 0
 4427  4428  4429  1089  4432 0

c  -1-1 --> -2
c    ( b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧ -p_1089) -> ( b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0)
c  in CNF:
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨  b^{1, 1090}_2
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨  b^{1, 1090}_1
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨  p_1089 ∨ -b^{1, 1090}_0
c  in DIMACS:
-4427  4428 -4429  1089  4430 0
-4427  4428 -4429  1089  4431 0
-4427  4428 -4429  1089 -4432 0

c  -2-1 --> break 
c    ( b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-4427 -4428  4429  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1089}_2 ∧ -b^{1, 1089}_1 ∧ -b^{1, 1089}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1089}_2 ∨  b^{1, 1089}_1 ∨  b^{1, 1089}_0 ∨ false 
c  in DIMACS:
-4427  4428  4429  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧ true) 
c  in CNF:
c     b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ false 
c  in DIMACS:
 4427 -4428 -4429  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1089}_2 ∧  b^{1, 1089}_1 ∧  b^{1, 1089}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1089}_2 ∨ -b^{1, 1089}_1 ∨ -b^{1, 1089}_0 ∨ false 
c  in DIMACS:
-4427 -4428 -4429  0

c i = 1090
c  -2+1 --> -1
c    ( b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧  p_1090) -> ( b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0)
c  in CNF:
c    -b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨  b^{1, 1091}_2
c    -b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_1
c    -b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨  b^{1, 1091}_0
c  in DIMACS:
-4430 -4431  4432 -1090  4433 0
-4430 -4431  4432 -1090 -4434 0
-4430 -4431  4432 -1090  4435 0

c  -1+1 --> 0
c    ( b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧  p_1090) -> (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧ -b^{1, 1091}_0)
c  in CNF:
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_2
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_1
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_0
c  in DIMACS:
-4430  4431 -4432 -1090 -4433 0
-4430  4431 -4432 -1090 -4434 0
-4430  4431 -4432 -1090 -4435 0

c  0+1 --> 1
c    (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧  p_1090) -> (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0)
c  in CNF:
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_2
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_1
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨  b^{1, 1091}_0
c  in DIMACS:
 4430  4431  4432 -1090 -4433 0
 4430  4431  4432 -1090 -4434 0
 4430  4431  4432 -1090  4435 0

c  1+1 --> 2
c    (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧  p_1090) -> (-b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0)
c  in CNF:
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_2
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨  b^{1, 1091}_1
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ -p_1090 ∨ -b^{1, 1091}_0
c  in DIMACS:
 4430  4431 -4432 -1090 -4433 0
 4430  4431 -4432 -1090  4434 0
 4430  4431 -4432 -1090 -4435 0

c  2+1 --> break 
c    (-b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 4430 -4431  4432 -1090 1162 0


c  2-1 --> 1
c    (-b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧ -p_1090) -> (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0)
c  in CNF:
c     b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_2
c     b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_1
c     b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨  b^{1, 1091}_0
c  in DIMACS:
 4430 -4431  4432  1090 -4433 0
 4430 -4431  4432  1090 -4434 0
 4430 -4431  4432  1090  4435 0

c  1-1 --> 0
c    (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧ -p_1090) -> (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧ -b^{1, 1091}_0)
c  in CNF:
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_2
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_1
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_0
c  in DIMACS:
 4430  4431 -4432  1090 -4433 0
 4430  4431 -4432  1090 -4434 0
 4430  4431 -4432  1090 -4435 0

c  0-1 --> -1
c    (-b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧ -p_1090) -> ( b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0)
c  in CNF:
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨  b^{1, 1091}_2
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_1
c     b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨  b^{1, 1091}_0
c  in DIMACS:
 4430  4431  4432  1090  4433 0
 4430  4431  4432  1090 -4434 0
 4430  4431  4432  1090  4435 0

c  -1-1 --> -2
c    ( b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧ -p_1090) -> ( b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0)
c  in CNF:
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨  b^{1, 1091}_2
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨  b^{1, 1091}_1
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨  p_1090 ∨ -b^{1, 1091}_0
c  in DIMACS:
-4430  4431 -4432  1090  4433 0
-4430  4431 -4432  1090  4434 0
-4430  4431 -4432  1090 -4435 0

c  -2-1 --> break 
c    ( b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-4430 -4431  4432  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1090}_2 ∧ -b^{1, 1090}_1 ∧ -b^{1, 1090}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1090}_2 ∨  b^{1, 1090}_1 ∨  b^{1, 1090}_0 ∨ false 
c  in DIMACS:
-4430  4431  4432  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧ true) 
c  in CNF:
c     b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ false 
c  in DIMACS:
 4430 -4431 -4432  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1090}_2 ∧  b^{1, 1090}_1 ∧  b^{1, 1090}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1090}_2 ∨ -b^{1, 1090}_1 ∨ -b^{1, 1090}_0 ∨ false 
c  in DIMACS:
-4430 -4431 -4432  0

c i = 1091
c  -2+1 --> -1
c    ( b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧  p_1091) -> ( b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0)
c  in CNF:
c    -b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨  b^{1, 1092}_2
c    -b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_1
c    -b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨  b^{1, 1092}_0
c  in DIMACS:
-4433 -4434  4435 -1091  4436 0
-4433 -4434  4435 -1091 -4437 0
-4433 -4434  4435 -1091  4438 0

c  -1+1 --> 0
c    ( b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧  p_1091) -> (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧ -b^{1, 1092}_0)
c  in CNF:
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_2
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_1
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_0
c  in DIMACS:
-4433  4434 -4435 -1091 -4436 0
-4433  4434 -4435 -1091 -4437 0
-4433  4434 -4435 -1091 -4438 0

c  0+1 --> 1
c    (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧  p_1091) -> (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0)
c  in CNF:
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_2
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_1
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨  b^{1, 1092}_0
c  in DIMACS:
 4433  4434  4435 -1091 -4436 0
 4433  4434  4435 -1091 -4437 0
 4433  4434  4435 -1091  4438 0

c  1+1 --> 2
c    (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧  p_1091) -> (-b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0)
c  in CNF:
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_2
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨  b^{1, 1092}_1
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ -p_1091 ∨ -b^{1, 1092}_0
c  in DIMACS:
 4433  4434 -4435 -1091 -4436 0
 4433  4434 -4435 -1091  4437 0
 4433  4434 -4435 -1091 -4438 0

c  2+1 --> break 
c    (-b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧  p_1091) -> break
c  in CNF:
c     b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ -p_1091 ∨ break
c  in DIMACS:
 4433 -4434  4435 -1091 1162 0


c  2-1 --> 1
c    (-b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧ -p_1091) -> (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0)
c  in CNF:
c     b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_2
c     b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_1
c     b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨  b^{1, 1092}_0
c  in DIMACS:
 4433 -4434  4435  1091 -4436 0
 4433 -4434  4435  1091 -4437 0
 4433 -4434  4435  1091  4438 0

c  1-1 --> 0
c    (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧ -p_1091) -> (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧ -b^{1, 1092}_0)
c  in CNF:
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_2
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_1
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_0
c  in DIMACS:
 4433  4434 -4435  1091 -4436 0
 4433  4434 -4435  1091 -4437 0
 4433  4434 -4435  1091 -4438 0

c  0-1 --> -1
c    (-b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧ -p_1091) -> ( b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0)
c  in CNF:
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨  b^{1, 1092}_2
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_1
c     b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨  b^{1, 1092}_0
c  in DIMACS:
 4433  4434  4435  1091  4436 0
 4433  4434  4435  1091 -4437 0
 4433  4434  4435  1091  4438 0

c  -1-1 --> -2
c    ( b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧ -p_1091) -> ( b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0)
c  in CNF:
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨  b^{1, 1092}_2
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨  b^{1, 1092}_1
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨  p_1091 ∨ -b^{1, 1092}_0
c  in DIMACS:
-4433  4434 -4435  1091  4436 0
-4433  4434 -4435  1091  4437 0
-4433  4434 -4435  1091 -4438 0

c  -2-1 --> break 
c    ( b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧ -p_1091) -> break
c  in CNF:
c    -b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨  p_1091 ∨ break
c  in DIMACS:
-4433 -4434  4435  1091 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1091}_2 ∧ -b^{1, 1091}_1 ∧ -b^{1, 1091}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1091}_2 ∨  b^{1, 1091}_1 ∨  b^{1, 1091}_0 ∨ false 
c  in DIMACS:
-4433  4434  4435  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧ true) 
c  in CNF:
c     b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ false 
c  in DIMACS:
 4433 -4434 -4435  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1091}_2 ∧  b^{1, 1091}_1 ∧  b^{1, 1091}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1091}_2 ∨ -b^{1, 1091}_1 ∨ -b^{1, 1091}_0 ∨ false 
c  in DIMACS:
-4433 -4434 -4435  0

c i = 1092
c  -2+1 --> -1
c    ( b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧  p_1092) -> ( b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0)
c  in CNF:
c    -b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨  b^{1, 1093}_2
c    -b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_1
c    -b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨  b^{1, 1093}_0
c  in DIMACS:
-4436 -4437  4438 -1092  4439 0
-4436 -4437  4438 -1092 -4440 0
-4436 -4437  4438 -1092  4441 0

c  -1+1 --> 0
c    ( b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧  p_1092) -> (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧ -b^{1, 1093}_0)
c  in CNF:
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_2
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_1
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_0
c  in DIMACS:
-4436  4437 -4438 -1092 -4439 0
-4436  4437 -4438 -1092 -4440 0
-4436  4437 -4438 -1092 -4441 0

c  0+1 --> 1
c    (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧  p_1092) -> (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0)
c  in CNF:
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_2
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_1
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨  b^{1, 1093}_0
c  in DIMACS:
 4436  4437  4438 -1092 -4439 0
 4436  4437  4438 -1092 -4440 0
 4436  4437  4438 -1092  4441 0

c  1+1 --> 2
c    (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧  p_1092) -> (-b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0)
c  in CNF:
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_2
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨  b^{1, 1093}_1
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ -p_1092 ∨ -b^{1, 1093}_0
c  in DIMACS:
 4436  4437 -4438 -1092 -4439 0
 4436  4437 -4438 -1092  4440 0
 4436  4437 -4438 -1092 -4441 0

c  2+1 --> break 
c    (-b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 4436 -4437  4438 -1092 1162 0


c  2-1 --> 1
c    (-b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧ -p_1092) -> (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0)
c  in CNF:
c     b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_2
c     b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_1
c     b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨  b^{1, 1093}_0
c  in DIMACS:
 4436 -4437  4438  1092 -4439 0
 4436 -4437  4438  1092 -4440 0
 4436 -4437  4438  1092  4441 0

c  1-1 --> 0
c    (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧ -p_1092) -> (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧ -b^{1, 1093}_0)
c  in CNF:
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_2
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_1
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_0
c  in DIMACS:
 4436  4437 -4438  1092 -4439 0
 4436  4437 -4438  1092 -4440 0
 4436  4437 -4438  1092 -4441 0

c  0-1 --> -1
c    (-b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧ -p_1092) -> ( b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0)
c  in CNF:
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨  b^{1, 1093}_2
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_1
c     b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨  b^{1, 1093}_0
c  in DIMACS:
 4436  4437  4438  1092  4439 0
 4436  4437  4438  1092 -4440 0
 4436  4437  4438  1092  4441 0

c  -1-1 --> -2
c    ( b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧ -p_1092) -> ( b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0)
c  in CNF:
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨  b^{1, 1093}_2
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨  b^{1, 1093}_1
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨  p_1092 ∨ -b^{1, 1093}_0
c  in DIMACS:
-4436  4437 -4438  1092  4439 0
-4436  4437 -4438  1092  4440 0
-4436  4437 -4438  1092 -4441 0

c  -2-1 --> break 
c    ( b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-4436 -4437  4438  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1092}_2 ∧ -b^{1, 1092}_1 ∧ -b^{1, 1092}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1092}_2 ∨  b^{1, 1092}_1 ∨  b^{1, 1092}_0 ∨ false 
c  in DIMACS:
-4436  4437  4438  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧ true) 
c  in CNF:
c     b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ false 
c  in DIMACS:
 4436 -4437 -4438  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1092}_2 ∧  b^{1, 1092}_1 ∧  b^{1, 1092}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1092}_2 ∨ -b^{1, 1092}_1 ∨ -b^{1, 1092}_0 ∨ false 
c  in DIMACS:
-4436 -4437 -4438  0

c i = 1093
c  -2+1 --> -1
c    ( b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧  p_1093) -> ( b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0)
c  in CNF:
c    -b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨  b^{1, 1094}_2
c    -b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_1
c    -b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨  b^{1, 1094}_0
c  in DIMACS:
-4439 -4440  4441 -1093  4442 0
-4439 -4440  4441 -1093 -4443 0
-4439 -4440  4441 -1093  4444 0

c  -1+1 --> 0
c    ( b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧  p_1093) -> (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧ -b^{1, 1094}_0)
c  in CNF:
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_2
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_1
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_0
c  in DIMACS:
-4439  4440 -4441 -1093 -4442 0
-4439  4440 -4441 -1093 -4443 0
-4439  4440 -4441 -1093 -4444 0

c  0+1 --> 1
c    (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧  p_1093) -> (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0)
c  in CNF:
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_2
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_1
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨  b^{1, 1094}_0
c  in DIMACS:
 4439  4440  4441 -1093 -4442 0
 4439  4440  4441 -1093 -4443 0
 4439  4440  4441 -1093  4444 0

c  1+1 --> 2
c    (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧  p_1093) -> (-b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0)
c  in CNF:
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_2
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨  b^{1, 1094}_1
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ -p_1093 ∨ -b^{1, 1094}_0
c  in DIMACS:
 4439  4440 -4441 -1093 -4442 0
 4439  4440 -4441 -1093  4443 0
 4439  4440 -4441 -1093 -4444 0

c  2+1 --> break 
c    (-b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧  p_1093) -> break
c  in CNF:
c     b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ -p_1093 ∨ break
c  in DIMACS:
 4439 -4440  4441 -1093 1162 0


c  2-1 --> 1
c    (-b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧ -p_1093) -> (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0)
c  in CNF:
c     b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_2
c     b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_1
c     b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨  b^{1, 1094}_0
c  in DIMACS:
 4439 -4440  4441  1093 -4442 0
 4439 -4440  4441  1093 -4443 0
 4439 -4440  4441  1093  4444 0

c  1-1 --> 0
c    (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧ -p_1093) -> (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧ -b^{1, 1094}_0)
c  in CNF:
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_2
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_1
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_0
c  in DIMACS:
 4439  4440 -4441  1093 -4442 0
 4439  4440 -4441  1093 -4443 0
 4439  4440 -4441  1093 -4444 0

c  0-1 --> -1
c    (-b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧ -p_1093) -> ( b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0)
c  in CNF:
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨  b^{1, 1094}_2
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_1
c     b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨  b^{1, 1094}_0
c  in DIMACS:
 4439  4440  4441  1093  4442 0
 4439  4440  4441  1093 -4443 0
 4439  4440  4441  1093  4444 0

c  -1-1 --> -2
c    ( b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧ -p_1093) -> ( b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0)
c  in CNF:
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨  b^{1, 1094}_2
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨  b^{1, 1094}_1
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨  p_1093 ∨ -b^{1, 1094}_0
c  in DIMACS:
-4439  4440 -4441  1093  4442 0
-4439  4440 -4441  1093  4443 0
-4439  4440 -4441  1093 -4444 0

c  -2-1 --> break 
c    ( b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧ -p_1093) -> break
c  in CNF:
c    -b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨  p_1093 ∨ break
c  in DIMACS:
-4439 -4440  4441  1093 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1093}_2 ∧ -b^{1, 1093}_1 ∧ -b^{1, 1093}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1093}_2 ∨  b^{1, 1093}_1 ∨  b^{1, 1093}_0 ∨ false 
c  in DIMACS:
-4439  4440  4441  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧ true) 
c  in CNF:
c     b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ false 
c  in DIMACS:
 4439 -4440 -4441  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1093}_2 ∧  b^{1, 1093}_1 ∧  b^{1, 1093}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1093}_2 ∨ -b^{1, 1093}_1 ∨ -b^{1, 1093}_0 ∨ false 
c  in DIMACS:
-4439 -4440 -4441  0

c i = 1094
c  -2+1 --> -1
c    ( b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧  p_1094) -> ( b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0)
c  in CNF:
c    -b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨  b^{1, 1095}_2
c    -b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_1
c    -b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨  b^{1, 1095}_0
c  in DIMACS:
-4442 -4443  4444 -1094  4445 0
-4442 -4443  4444 -1094 -4446 0
-4442 -4443  4444 -1094  4447 0

c  -1+1 --> 0
c    ( b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧  p_1094) -> (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧ -b^{1, 1095}_0)
c  in CNF:
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_2
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_1
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_0
c  in DIMACS:
-4442  4443 -4444 -1094 -4445 0
-4442  4443 -4444 -1094 -4446 0
-4442  4443 -4444 -1094 -4447 0

c  0+1 --> 1
c    (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧  p_1094) -> (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0)
c  in CNF:
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_2
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_1
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨  b^{1, 1095}_0
c  in DIMACS:
 4442  4443  4444 -1094 -4445 0
 4442  4443  4444 -1094 -4446 0
 4442  4443  4444 -1094  4447 0

c  1+1 --> 2
c    (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧  p_1094) -> (-b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0)
c  in CNF:
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_2
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨  b^{1, 1095}_1
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ -p_1094 ∨ -b^{1, 1095}_0
c  in DIMACS:
 4442  4443 -4444 -1094 -4445 0
 4442  4443 -4444 -1094  4446 0
 4442  4443 -4444 -1094 -4447 0

c  2+1 --> break 
c    (-b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧  p_1094) -> break
c  in CNF:
c     b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ -p_1094 ∨ break
c  in DIMACS:
 4442 -4443  4444 -1094 1162 0


c  2-1 --> 1
c    (-b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧ -p_1094) -> (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0)
c  in CNF:
c     b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_2
c     b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_1
c     b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨  b^{1, 1095}_0
c  in DIMACS:
 4442 -4443  4444  1094 -4445 0
 4442 -4443  4444  1094 -4446 0
 4442 -4443  4444  1094  4447 0

c  1-1 --> 0
c    (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧ -p_1094) -> (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧ -b^{1, 1095}_0)
c  in CNF:
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_2
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_1
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_0
c  in DIMACS:
 4442  4443 -4444  1094 -4445 0
 4442  4443 -4444  1094 -4446 0
 4442  4443 -4444  1094 -4447 0

c  0-1 --> -1
c    (-b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧ -p_1094) -> ( b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0)
c  in CNF:
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨  b^{1, 1095}_2
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_1
c     b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨  b^{1, 1095}_0
c  in DIMACS:
 4442  4443  4444  1094  4445 0
 4442  4443  4444  1094 -4446 0
 4442  4443  4444  1094  4447 0

c  -1-1 --> -2
c    ( b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧ -p_1094) -> ( b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0)
c  in CNF:
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨  b^{1, 1095}_2
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨  b^{1, 1095}_1
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨  p_1094 ∨ -b^{1, 1095}_0
c  in DIMACS:
-4442  4443 -4444  1094  4445 0
-4442  4443 -4444  1094  4446 0
-4442  4443 -4444  1094 -4447 0

c  -2-1 --> break 
c    ( b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧ -p_1094) -> break
c  in CNF:
c    -b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨  p_1094 ∨ break
c  in DIMACS:
-4442 -4443  4444  1094 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1094}_2 ∧ -b^{1, 1094}_1 ∧ -b^{1, 1094}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1094}_2 ∨  b^{1, 1094}_1 ∨  b^{1, 1094}_0 ∨ false 
c  in DIMACS:
-4442  4443  4444  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧ true) 
c  in CNF:
c     b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ false 
c  in DIMACS:
 4442 -4443 -4444  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1094}_2 ∧  b^{1, 1094}_1 ∧  b^{1, 1094}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1094}_2 ∨ -b^{1, 1094}_1 ∨ -b^{1, 1094}_0 ∨ false 
c  in DIMACS:
-4442 -4443 -4444  0

c i = 1095
c  -2+1 --> -1
c    ( b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧  p_1095) -> ( b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0)
c  in CNF:
c    -b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨  b^{1, 1096}_2
c    -b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_1
c    -b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨  b^{1, 1096}_0
c  in DIMACS:
-4445 -4446  4447 -1095  4448 0
-4445 -4446  4447 -1095 -4449 0
-4445 -4446  4447 -1095  4450 0

c  -1+1 --> 0
c    ( b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧  p_1095) -> (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧ -b^{1, 1096}_0)
c  in CNF:
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_2
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_1
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_0
c  in DIMACS:
-4445  4446 -4447 -1095 -4448 0
-4445  4446 -4447 -1095 -4449 0
-4445  4446 -4447 -1095 -4450 0

c  0+1 --> 1
c    (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧  p_1095) -> (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0)
c  in CNF:
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_2
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_1
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨  b^{1, 1096}_0
c  in DIMACS:
 4445  4446  4447 -1095 -4448 0
 4445  4446  4447 -1095 -4449 0
 4445  4446  4447 -1095  4450 0

c  1+1 --> 2
c    (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧  p_1095) -> (-b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0)
c  in CNF:
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_2
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨  b^{1, 1096}_1
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ -p_1095 ∨ -b^{1, 1096}_0
c  in DIMACS:
 4445  4446 -4447 -1095 -4448 0
 4445  4446 -4447 -1095  4449 0
 4445  4446 -4447 -1095 -4450 0

c  2+1 --> break 
c    (-b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 4445 -4446  4447 -1095 1162 0


c  2-1 --> 1
c    (-b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧ -p_1095) -> (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0)
c  in CNF:
c     b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_2
c     b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_1
c     b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨  b^{1, 1096}_0
c  in DIMACS:
 4445 -4446  4447  1095 -4448 0
 4445 -4446  4447  1095 -4449 0
 4445 -4446  4447  1095  4450 0

c  1-1 --> 0
c    (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧ -p_1095) -> (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧ -b^{1, 1096}_0)
c  in CNF:
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_2
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_1
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_0
c  in DIMACS:
 4445  4446 -4447  1095 -4448 0
 4445  4446 -4447  1095 -4449 0
 4445  4446 -4447  1095 -4450 0

c  0-1 --> -1
c    (-b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧ -p_1095) -> ( b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0)
c  in CNF:
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨  b^{1, 1096}_2
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_1
c     b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨  b^{1, 1096}_0
c  in DIMACS:
 4445  4446  4447  1095  4448 0
 4445  4446  4447  1095 -4449 0
 4445  4446  4447  1095  4450 0

c  -1-1 --> -2
c    ( b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧ -p_1095) -> ( b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0)
c  in CNF:
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨  b^{1, 1096}_2
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨  b^{1, 1096}_1
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨  p_1095 ∨ -b^{1, 1096}_0
c  in DIMACS:
-4445  4446 -4447  1095  4448 0
-4445  4446 -4447  1095  4449 0
-4445  4446 -4447  1095 -4450 0

c  -2-1 --> break 
c    ( b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-4445 -4446  4447  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1095}_2 ∧ -b^{1, 1095}_1 ∧ -b^{1, 1095}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1095}_2 ∨  b^{1, 1095}_1 ∨  b^{1, 1095}_0 ∨ false 
c  in DIMACS:
-4445  4446  4447  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧ true) 
c  in CNF:
c     b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ false 
c  in DIMACS:
 4445 -4446 -4447  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1095}_2 ∧  b^{1, 1095}_1 ∧  b^{1, 1095}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1095}_2 ∨ -b^{1, 1095}_1 ∨ -b^{1, 1095}_0 ∨ false 
c  in DIMACS:
-4445 -4446 -4447  0

c i = 1096
c  -2+1 --> -1
c    ( b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧  p_1096) -> ( b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0)
c  in CNF:
c    -b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨  b^{1, 1097}_2
c    -b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_1
c    -b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨  b^{1, 1097}_0
c  in DIMACS:
-4448 -4449  4450 -1096  4451 0
-4448 -4449  4450 -1096 -4452 0
-4448 -4449  4450 -1096  4453 0

c  -1+1 --> 0
c    ( b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧  p_1096) -> (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧ -b^{1, 1097}_0)
c  in CNF:
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_2
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_1
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_0
c  in DIMACS:
-4448  4449 -4450 -1096 -4451 0
-4448  4449 -4450 -1096 -4452 0
-4448  4449 -4450 -1096 -4453 0

c  0+1 --> 1
c    (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧  p_1096) -> (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0)
c  in CNF:
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_2
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_1
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨  b^{1, 1097}_0
c  in DIMACS:
 4448  4449  4450 -1096 -4451 0
 4448  4449  4450 -1096 -4452 0
 4448  4449  4450 -1096  4453 0

c  1+1 --> 2
c    (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧  p_1096) -> (-b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0)
c  in CNF:
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_2
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨  b^{1, 1097}_1
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ -p_1096 ∨ -b^{1, 1097}_0
c  in DIMACS:
 4448  4449 -4450 -1096 -4451 0
 4448  4449 -4450 -1096  4452 0
 4448  4449 -4450 -1096 -4453 0

c  2+1 --> break 
c    (-b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 4448 -4449  4450 -1096 1162 0


c  2-1 --> 1
c    (-b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧ -p_1096) -> (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0)
c  in CNF:
c     b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_2
c     b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_1
c     b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨  b^{1, 1097}_0
c  in DIMACS:
 4448 -4449  4450  1096 -4451 0
 4448 -4449  4450  1096 -4452 0
 4448 -4449  4450  1096  4453 0

c  1-1 --> 0
c    (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧ -p_1096) -> (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧ -b^{1, 1097}_0)
c  in CNF:
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_2
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_1
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_0
c  in DIMACS:
 4448  4449 -4450  1096 -4451 0
 4448  4449 -4450  1096 -4452 0
 4448  4449 -4450  1096 -4453 0

c  0-1 --> -1
c    (-b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧ -p_1096) -> ( b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0)
c  in CNF:
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨  b^{1, 1097}_2
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_1
c     b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨  b^{1, 1097}_0
c  in DIMACS:
 4448  4449  4450  1096  4451 0
 4448  4449  4450  1096 -4452 0
 4448  4449  4450  1096  4453 0

c  -1-1 --> -2
c    ( b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧ -p_1096) -> ( b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0)
c  in CNF:
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨  b^{1, 1097}_2
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨  b^{1, 1097}_1
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨  p_1096 ∨ -b^{1, 1097}_0
c  in DIMACS:
-4448  4449 -4450  1096  4451 0
-4448  4449 -4450  1096  4452 0
-4448  4449 -4450  1096 -4453 0

c  -2-1 --> break 
c    ( b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-4448 -4449  4450  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1096}_2 ∧ -b^{1, 1096}_1 ∧ -b^{1, 1096}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1096}_2 ∨  b^{1, 1096}_1 ∨  b^{1, 1096}_0 ∨ false 
c  in DIMACS:
-4448  4449  4450  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧ true) 
c  in CNF:
c     b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ false 
c  in DIMACS:
 4448 -4449 -4450  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1096}_2 ∧  b^{1, 1096}_1 ∧  b^{1, 1096}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1096}_2 ∨ -b^{1, 1096}_1 ∨ -b^{1, 1096}_0 ∨ false 
c  in DIMACS:
-4448 -4449 -4450  0

c i = 1097
c  -2+1 --> -1
c    ( b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧  p_1097) -> ( b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0)
c  in CNF:
c    -b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨  b^{1, 1098}_2
c    -b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_1
c    -b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨  b^{1, 1098}_0
c  in DIMACS:
-4451 -4452  4453 -1097  4454 0
-4451 -4452  4453 -1097 -4455 0
-4451 -4452  4453 -1097  4456 0

c  -1+1 --> 0
c    ( b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧  p_1097) -> (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧ -b^{1, 1098}_0)
c  in CNF:
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_2
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_1
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_0
c  in DIMACS:
-4451  4452 -4453 -1097 -4454 0
-4451  4452 -4453 -1097 -4455 0
-4451  4452 -4453 -1097 -4456 0

c  0+1 --> 1
c    (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧  p_1097) -> (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0)
c  in CNF:
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_2
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_1
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨  b^{1, 1098}_0
c  in DIMACS:
 4451  4452  4453 -1097 -4454 0
 4451  4452  4453 -1097 -4455 0
 4451  4452  4453 -1097  4456 0

c  1+1 --> 2
c    (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧  p_1097) -> (-b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0)
c  in CNF:
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_2
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨  b^{1, 1098}_1
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ -p_1097 ∨ -b^{1, 1098}_0
c  in DIMACS:
 4451  4452 -4453 -1097 -4454 0
 4451  4452 -4453 -1097  4455 0
 4451  4452 -4453 -1097 -4456 0

c  2+1 --> break 
c    (-b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧  p_1097) -> break
c  in CNF:
c     b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ -p_1097 ∨ break
c  in DIMACS:
 4451 -4452  4453 -1097 1162 0


c  2-1 --> 1
c    (-b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧ -p_1097) -> (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0)
c  in CNF:
c     b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_2
c     b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_1
c     b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨  b^{1, 1098}_0
c  in DIMACS:
 4451 -4452  4453  1097 -4454 0
 4451 -4452  4453  1097 -4455 0
 4451 -4452  4453  1097  4456 0

c  1-1 --> 0
c    (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧ -p_1097) -> (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧ -b^{1, 1098}_0)
c  in CNF:
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_2
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_1
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_0
c  in DIMACS:
 4451  4452 -4453  1097 -4454 0
 4451  4452 -4453  1097 -4455 0
 4451  4452 -4453  1097 -4456 0

c  0-1 --> -1
c    (-b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧ -p_1097) -> ( b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0)
c  in CNF:
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨  b^{1, 1098}_2
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_1
c     b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨  b^{1, 1098}_0
c  in DIMACS:
 4451  4452  4453  1097  4454 0
 4451  4452  4453  1097 -4455 0
 4451  4452  4453  1097  4456 0

c  -1-1 --> -2
c    ( b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧ -p_1097) -> ( b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0)
c  in CNF:
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨  b^{1, 1098}_2
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨  b^{1, 1098}_1
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨  p_1097 ∨ -b^{1, 1098}_0
c  in DIMACS:
-4451  4452 -4453  1097  4454 0
-4451  4452 -4453  1097  4455 0
-4451  4452 -4453  1097 -4456 0

c  -2-1 --> break 
c    ( b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧ -p_1097) -> break
c  in CNF:
c    -b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨  p_1097 ∨ break
c  in DIMACS:
-4451 -4452  4453  1097 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1097}_2 ∧ -b^{1, 1097}_1 ∧ -b^{1, 1097}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1097}_2 ∨  b^{1, 1097}_1 ∨  b^{1, 1097}_0 ∨ false 
c  in DIMACS:
-4451  4452  4453  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧ true) 
c  in CNF:
c     b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ false 
c  in DIMACS:
 4451 -4452 -4453  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1097}_2 ∧  b^{1, 1097}_1 ∧  b^{1, 1097}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1097}_2 ∨ -b^{1, 1097}_1 ∨ -b^{1, 1097}_0 ∨ false 
c  in DIMACS:
-4451 -4452 -4453  0

c i = 1098
c  -2+1 --> -1
c    ( b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧  p_1098) -> ( b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0)
c  in CNF:
c    -b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨  b^{1, 1099}_2
c    -b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_1
c    -b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨  b^{1, 1099}_0
c  in DIMACS:
-4454 -4455  4456 -1098  4457 0
-4454 -4455  4456 -1098 -4458 0
-4454 -4455  4456 -1098  4459 0

c  -1+1 --> 0
c    ( b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧  p_1098) -> (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧ -b^{1, 1099}_0)
c  in CNF:
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_2
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_1
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_0
c  in DIMACS:
-4454  4455 -4456 -1098 -4457 0
-4454  4455 -4456 -1098 -4458 0
-4454  4455 -4456 -1098 -4459 0

c  0+1 --> 1
c    (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧  p_1098) -> (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0)
c  in CNF:
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_2
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_1
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨  b^{1, 1099}_0
c  in DIMACS:
 4454  4455  4456 -1098 -4457 0
 4454  4455  4456 -1098 -4458 0
 4454  4455  4456 -1098  4459 0

c  1+1 --> 2
c    (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧  p_1098) -> (-b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0)
c  in CNF:
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_2
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨  b^{1, 1099}_1
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ -p_1098 ∨ -b^{1, 1099}_0
c  in DIMACS:
 4454  4455 -4456 -1098 -4457 0
 4454  4455 -4456 -1098  4458 0
 4454  4455 -4456 -1098 -4459 0

c  2+1 --> break 
c    (-b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 4454 -4455  4456 -1098 1162 0


c  2-1 --> 1
c    (-b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧ -p_1098) -> (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0)
c  in CNF:
c     b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_2
c     b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_1
c     b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨  b^{1, 1099}_0
c  in DIMACS:
 4454 -4455  4456  1098 -4457 0
 4454 -4455  4456  1098 -4458 0
 4454 -4455  4456  1098  4459 0

c  1-1 --> 0
c    (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧ -p_1098) -> (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧ -b^{1, 1099}_0)
c  in CNF:
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_2
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_1
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_0
c  in DIMACS:
 4454  4455 -4456  1098 -4457 0
 4454  4455 -4456  1098 -4458 0
 4454  4455 -4456  1098 -4459 0

c  0-1 --> -1
c    (-b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧ -p_1098) -> ( b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0)
c  in CNF:
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨  b^{1, 1099}_2
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_1
c     b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨  b^{1, 1099}_0
c  in DIMACS:
 4454  4455  4456  1098  4457 0
 4454  4455  4456  1098 -4458 0
 4454  4455  4456  1098  4459 0

c  -1-1 --> -2
c    ( b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧ -p_1098) -> ( b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0)
c  in CNF:
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨  b^{1, 1099}_2
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨  b^{1, 1099}_1
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨  p_1098 ∨ -b^{1, 1099}_0
c  in DIMACS:
-4454  4455 -4456  1098  4457 0
-4454  4455 -4456  1098  4458 0
-4454  4455 -4456  1098 -4459 0

c  -2-1 --> break 
c    ( b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-4454 -4455  4456  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1098}_2 ∧ -b^{1, 1098}_1 ∧ -b^{1, 1098}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1098}_2 ∨  b^{1, 1098}_1 ∨  b^{1, 1098}_0 ∨ false 
c  in DIMACS:
-4454  4455  4456  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧ true) 
c  in CNF:
c     b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ false 
c  in DIMACS:
 4454 -4455 -4456  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1098}_2 ∧  b^{1, 1098}_1 ∧  b^{1, 1098}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1098}_2 ∨ -b^{1, 1098}_1 ∨ -b^{1, 1098}_0 ∨ false 
c  in DIMACS:
-4454 -4455 -4456  0

c i = 1099
c  -2+1 --> -1
c    ( b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧  p_1099) -> ( b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0)
c  in CNF:
c    -b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨  b^{1, 1100}_2
c    -b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_1
c    -b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨  b^{1, 1100}_0
c  in DIMACS:
-4457 -4458  4459 -1099  4460 0
-4457 -4458  4459 -1099 -4461 0
-4457 -4458  4459 -1099  4462 0

c  -1+1 --> 0
c    ( b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧  p_1099) -> (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧ -b^{1, 1100}_0)
c  in CNF:
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_2
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_1
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_0
c  in DIMACS:
-4457  4458 -4459 -1099 -4460 0
-4457  4458 -4459 -1099 -4461 0
-4457  4458 -4459 -1099 -4462 0

c  0+1 --> 1
c    (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧  p_1099) -> (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0)
c  in CNF:
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_2
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_1
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨  b^{1, 1100}_0
c  in DIMACS:
 4457  4458  4459 -1099 -4460 0
 4457  4458  4459 -1099 -4461 0
 4457  4458  4459 -1099  4462 0

c  1+1 --> 2
c    (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧  p_1099) -> (-b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0)
c  in CNF:
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_2
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨  b^{1, 1100}_1
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ -p_1099 ∨ -b^{1, 1100}_0
c  in DIMACS:
 4457  4458 -4459 -1099 -4460 0
 4457  4458 -4459 -1099  4461 0
 4457  4458 -4459 -1099 -4462 0

c  2+1 --> break 
c    (-b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧  p_1099) -> break
c  in CNF:
c     b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ -p_1099 ∨ break
c  in DIMACS:
 4457 -4458  4459 -1099 1162 0


c  2-1 --> 1
c    (-b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧ -p_1099) -> (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0)
c  in CNF:
c     b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_2
c     b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_1
c     b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨  b^{1, 1100}_0
c  in DIMACS:
 4457 -4458  4459  1099 -4460 0
 4457 -4458  4459  1099 -4461 0
 4457 -4458  4459  1099  4462 0

c  1-1 --> 0
c    (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧ -p_1099) -> (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧ -b^{1, 1100}_0)
c  in CNF:
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_2
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_1
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_0
c  in DIMACS:
 4457  4458 -4459  1099 -4460 0
 4457  4458 -4459  1099 -4461 0
 4457  4458 -4459  1099 -4462 0

c  0-1 --> -1
c    (-b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧ -p_1099) -> ( b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0)
c  in CNF:
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨  b^{1, 1100}_2
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_1
c     b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨  b^{1, 1100}_0
c  in DIMACS:
 4457  4458  4459  1099  4460 0
 4457  4458  4459  1099 -4461 0
 4457  4458  4459  1099  4462 0

c  -1-1 --> -2
c    ( b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧ -p_1099) -> ( b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0)
c  in CNF:
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨  b^{1, 1100}_2
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨  b^{1, 1100}_1
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨  p_1099 ∨ -b^{1, 1100}_0
c  in DIMACS:
-4457  4458 -4459  1099  4460 0
-4457  4458 -4459  1099  4461 0
-4457  4458 -4459  1099 -4462 0

c  -2-1 --> break 
c    ( b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧ -p_1099) -> break
c  in CNF:
c    -b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨  p_1099 ∨ break
c  in DIMACS:
-4457 -4458  4459  1099 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1099}_2 ∧ -b^{1, 1099}_1 ∧ -b^{1, 1099}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1099}_2 ∨  b^{1, 1099}_1 ∨  b^{1, 1099}_0 ∨ false 
c  in DIMACS:
-4457  4458  4459  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧ true) 
c  in CNF:
c     b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ false 
c  in DIMACS:
 4457 -4458 -4459  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1099}_2 ∧  b^{1, 1099}_1 ∧  b^{1, 1099}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1099}_2 ∨ -b^{1, 1099}_1 ∨ -b^{1, 1099}_0 ∨ false 
c  in DIMACS:
-4457 -4458 -4459  0

c i = 1100
c  -2+1 --> -1
c    ( b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧  p_1100) -> ( b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0)
c  in CNF:
c    -b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨  b^{1, 1101}_2
c    -b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_1
c    -b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨  b^{1, 1101}_0
c  in DIMACS:
-4460 -4461  4462 -1100  4463 0
-4460 -4461  4462 -1100 -4464 0
-4460 -4461  4462 -1100  4465 0

c  -1+1 --> 0
c    ( b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧  p_1100) -> (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧ -b^{1, 1101}_0)
c  in CNF:
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_2
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_1
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_0
c  in DIMACS:
-4460  4461 -4462 -1100 -4463 0
-4460  4461 -4462 -1100 -4464 0
-4460  4461 -4462 -1100 -4465 0

c  0+1 --> 1
c    (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧  p_1100) -> (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0)
c  in CNF:
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_2
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_1
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨  b^{1, 1101}_0
c  in DIMACS:
 4460  4461  4462 -1100 -4463 0
 4460  4461  4462 -1100 -4464 0
 4460  4461  4462 -1100  4465 0

c  1+1 --> 2
c    (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧  p_1100) -> (-b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0)
c  in CNF:
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_2
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨  b^{1, 1101}_1
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ -p_1100 ∨ -b^{1, 1101}_0
c  in DIMACS:
 4460  4461 -4462 -1100 -4463 0
 4460  4461 -4462 -1100  4464 0
 4460  4461 -4462 -1100 -4465 0

c  2+1 --> break 
c    (-b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 4460 -4461  4462 -1100 1162 0


c  2-1 --> 1
c    (-b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧ -p_1100) -> (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0)
c  in CNF:
c     b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_2
c     b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_1
c     b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨  b^{1, 1101}_0
c  in DIMACS:
 4460 -4461  4462  1100 -4463 0
 4460 -4461  4462  1100 -4464 0
 4460 -4461  4462  1100  4465 0

c  1-1 --> 0
c    (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧ -p_1100) -> (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧ -b^{1, 1101}_0)
c  in CNF:
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_2
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_1
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_0
c  in DIMACS:
 4460  4461 -4462  1100 -4463 0
 4460  4461 -4462  1100 -4464 0
 4460  4461 -4462  1100 -4465 0

c  0-1 --> -1
c    (-b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧ -p_1100) -> ( b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0)
c  in CNF:
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨  b^{1, 1101}_2
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_1
c     b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨  b^{1, 1101}_0
c  in DIMACS:
 4460  4461  4462  1100  4463 0
 4460  4461  4462  1100 -4464 0
 4460  4461  4462  1100  4465 0

c  -1-1 --> -2
c    ( b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧ -p_1100) -> ( b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0)
c  in CNF:
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨  b^{1, 1101}_2
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨  b^{1, 1101}_1
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨  p_1100 ∨ -b^{1, 1101}_0
c  in DIMACS:
-4460  4461 -4462  1100  4463 0
-4460  4461 -4462  1100  4464 0
-4460  4461 -4462  1100 -4465 0

c  -2-1 --> break 
c    ( b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-4460 -4461  4462  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1100}_2 ∧ -b^{1, 1100}_1 ∧ -b^{1, 1100}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1100}_2 ∨  b^{1, 1100}_1 ∨  b^{1, 1100}_0 ∨ false 
c  in DIMACS:
-4460  4461  4462  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧ true) 
c  in CNF:
c     b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ false 
c  in DIMACS:
 4460 -4461 -4462  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1100}_2 ∧  b^{1, 1100}_1 ∧  b^{1, 1100}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1100}_2 ∨ -b^{1, 1100}_1 ∨ -b^{1, 1100}_0 ∨ false 
c  in DIMACS:
-4460 -4461 -4462  0

c i = 1101
c  -2+1 --> -1
c    ( b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧  p_1101) -> ( b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0)
c  in CNF:
c    -b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨  b^{1, 1102}_2
c    -b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_1
c    -b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨  b^{1, 1102}_0
c  in DIMACS:
-4463 -4464  4465 -1101  4466 0
-4463 -4464  4465 -1101 -4467 0
-4463 -4464  4465 -1101  4468 0

c  -1+1 --> 0
c    ( b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧  p_1101) -> (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧ -b^{1, 1102}_0)
c  in CNF:
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_2
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_1
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_0
c  in DIMACS:
-4463  4464 -4465 -1101 -4466 0
-4463  4464 -4465 -1101 -4467 0
-4463  4464 -4465 -1101 -4468 0

c  0+1 --> 1
c    (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧  p_1101) -> (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0)
c  in CNF:
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_2
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_1
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨  b^{1, 1102}_0
c  in DIMACS:
 4463  4464  4465 -1101 -4466 0
 4463  4464  4465 -1101 -4467 0
 4463  4464  4465 -1101  4468 0

c  1+1 --> 2
c    (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧  p_1101) -> (-b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0)
c  in CNF:
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_2
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨  b^{1, 1102}_1
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ -p_1101 ∨ -b^{1, 1102}_0
c  in DIMACS:
 4463  4464 -4465 -1101 -4466 0
 4463  4464 -4465 -1101  4467 0
 4463  4464 -4465 -1101 -4468 0

c  2+1 --> break 
c    (-b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧  p_1101) -> break
c  in CNF:
c     b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ -p_1101 ∨ break
c  in DIMACS:
 4463 -4464  4465 -1101 1162 0


c  2-1 --> 1
c    (-b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧ -p_1101) -> (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0)
c  in CNF:
c     b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_2
c     b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_1
c     b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨  b^{1, 1102}_0
c  in DIMACS:
 4463 -4464  4465  1101 -4466 0
 4463 -4464  4465  1101 -4467 0
 4463 -4464  4465  1101  4468 0

c  1-1 --> 0
c    (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧ -p_1101) -> (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧ -b^{1, 1102}_0)
c  in CNF:
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_2
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_1
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_0
c  in DIMACS:
 4463  4464 -4465  1101 -4466 0
 4463  4464 -4465  1101 -4467 0
 4463  4464 -4465  1101 -4468 0

c  0-1 --> -1
c    (-b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧ -p_1101) -> ( b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0)
c  in CNF:
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨  b^{1, 1102}_2
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_1
c     b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨  b^{1, 1102}_0
c  in DIMACS:
 4463  4464  4465  1101  4466 0
 4463  4464  4465  1101 -4467 0
 4463  4464  4465  1101  4468 0

c  -1-1 --> -2
c    ( b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧ -p_1101) -> ( b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0)
c  in CNF:
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨  b^{1, 1102}_2
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨  b^{1, 1102}_1
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨  p_1101 ∨ -b^{1, 1102}_0
c  in DIMACS:
-4463  4464 -4465  1101  4466 0
-4463  4464 -4465  1101  4467 0
-4463  4464 -4465  1101 -4468 0

c  -2-1 --> break 
c    ( b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧ -p_1101) -> break
c  in CNF:
c    -b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨  p_1101 ∨ break
c  in DIMACS:
-4463 -4464  4465  1101 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1101}_2 ∧ -b^{1, 1101}_1 ∧ -b^{1, 1101}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1101}_2 ∨  b^{1, 1101}_1 ∨  b^{1, 1101}_0 ∨ false 
c  in DIMACS:
-4463  4464  4465  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧ true) 
c  in CNF:
c     b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ false 
c  in DIMACS:
 4463 -4464 -4465  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1101}_2 ∧  b^{1, 1101}_1 ∧  b^{1, 1101}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1101}_2 ∨ -b^{1, 1101}_1 ∨ -b^{1, 1101}_0 ∨ false 
c  in DIMACS:
-4463 -4464 -4465  0

c i = 1102
c  -2+1 --> -1
c    ( b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧  p_1102) -> ( b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0)
c  in CNF:
c    -b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨  b^{1, 1103}_2
c    -b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_1
c    -b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨  b^{1, 1103}_0
c  in DIMACS:
-4466 -4467  4468 -1102  4469 0
-4466 -4467  4468 -1102 -4470 0
-4466 -4467  4468 -1102  4471 0

c  -1+1 --> 0
c    ( b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧  p_1102) -> (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧ -b^{1, 1103}_0)
c  in CNF:
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_2
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_1
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_0
c  in DIMACS:
-4466  4467 -4468 -1102 -4469 0
-4466  4467 -4468 -1102 -4470 0
-4466  4467 -4468 -1102 -4471 0

c  0+1 --> 1
c    (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧  p_1102) -> (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0)
c  in CNF:
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_2
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_1
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨  b^{1, 1103}_0
c  in DIMACS:
 4466  4467  4468 -1102 -4469 0
 4466  4467  4468 -1102 -4470 0
 4466  4467  4468 -1102  4471 0

c  1+1 --> 2
c    (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧  p_1102) -> (-b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0)
c  in CNF:
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_2
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨  b^{1, 1103}_1
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ -p_1102 ∨ -b^{1, 1103}_0
c  in DIMACS:
 4466  4467 -4468 -1102 -4469 0
 4466  4467 -4468 -1102  4470 0
 4466  4467 -4468 -1102 -4471 0

c  2+1 --> break 
c    (-b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 4466 -4467  4468 -1102 1162 0


c  2-1 --> 1
c    (-b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧ -p_1102) -> (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0)
c  in CNF:
c     b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_2
c     b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_1
c     b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨  b^{1, 1103}_0
c  in DIMACS:
 4466 -4467  4468  1102 -4469 0
 4466 -4467  4468  1102 -4470 0
 4466 -4467  4468  1102  4471 0

c  1-1 --> 0
c    (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧ -p_1102) -> (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧ -b^{1, 1103}_0)
c  in CNF:
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_2
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_1
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_0
c  in DIMACS:
 4466  4467 -4468  1102 -4469 0
 4466  4467 -4468  1102 -4470 0
 4466  4467 -4468  1102 -4471 0

c  0-1 --> -1
c    (-b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧ -p_1102) -> ( b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0)
c  in CNF:
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨  b^{1, 1103}_2
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_1
c     b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨  b^{1, 1103}_0
c  in DIMACS:
 4466  4467  4468  1102  4469 0
 4466  4467  4468  1102 -4470 0
 4466  4467  4468  1102  4471 0

c  -1-1 --> -2
c    ( b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧ -p_1102) -> ( b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0)
c  in CNF:
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨  b^{1, 1103}_2
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨  b^{1, 1103}_1
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨  p_1102 ∨ -b^{1, 1103}_0
c  in DIMACS:
-4466  4467 -4468  1102  4469 0
-4466  4467 -4468  1102  4470 0
-4466  4467 -4468  1102 -4471 0

c  -2-1 --> break 
c    ( b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-4466 -4467  4468  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1102}_2 ∧ -b^{1, 1102}_1 ∧ -b^{1, 1102}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1102}_2 ∨  b^{1, 1102}_1 ∨  b^{1, 1102}_0 ∨ false 
c  in DIMACS:
-4466  4467  4468  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧ true) 
c  in CNF:
c     b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ false 
c  in DIMACS:
 4466 -4467 -4468  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1102}_2 ∧  b^{1, 1102}_1 ∧  b^{1, 1102}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1102}_2 ∨ -b^{1, 1102}_1 ∨ -b^{1, 1102}_0 ∨ false 
c  in DIMACS:
-4466 -4467 -4468  0

c i = 1103
c  -2+1 --> -1
c    ( b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧  p_1103) -> ( b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0)
c  in CNF:
c    -b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨  b^{1, 1104}_2
c    -b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_1
c    -b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨  b^{1, 1104}_0
c  in DIMACS:
-4469 -4470  4471 -1103  4472 0
-4469 -4470  4471 -1103 -4473 0
-4469 -4470  4471 -1103  4474 0

c  -1+1 --> 0
c    ( b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧  p_1103) -> (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧ -b^{1, 1104}_0)
c  in CNF:
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_2
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_1
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_0
c  in DIMACS:
-4469  4470 -4471 -1103 -4472 0
-4469  4470 -4471 -1103 -4473 0
-4469  4470 -4471 -1103 -4474 0

c  0+1 --> 1
c    (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧  p_1103) -> (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0)
c  in CNF:
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_2
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_1
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨  b^{1, 1104}_0
c  in DIMACS:
 4469  4470  4471 -1103 -4472 0
 4469  4470  4471 -1103 -4473 0
 4469  4470  4471 -1103  4474 0

c  1+1 --> 2
c    (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧  p_1103) -> (-b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0)
c  in CNF:
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_2
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨  b^{1, 1104}_1
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ -p_1103 ∨ -b^{1, 1104}_0
c  in DIMACS:
 4469  4470 -4471 -1103 -4472 0
 4469  4470 -4471 -1103  4473 0
 4469  4470 -4471 -1103 -4474 0

c  2+1 --> break 
c    (-b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧  p_1103) -> break
c  in CNF:
c     b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ -p_1103 ∨ break
c  in DIMACS:
 4469 -4470  4471 -1103 1162 0


c  2-1 --> 1
c    (-b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧ -p_1103) -> (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0)
c  in CNF:
c     b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_2
c     b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_1
c     b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨  b^{1, 1104}_0
c  in DIMACS:
 4469 -4470  4471  1103 -4472 0
 4469 -4470  4471  1103 -4473 0
 4469 -4470  4471  1103  4474 0

c  1-1 --> 0
c    (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧ -p_1103) -> (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧ -b^{1, 1104}_0)
c  in CNF:
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_2
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_1
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_0
c  in DIMACS:
 4469  4470 -4471  1103 -4472 0
 4469  4470 -4471  1103 -4473 0
 4469  4470 -4471  1103 -4474 0

c  0-1 --> -1
c    (-b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧ -p_1103) -> ( b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0)
c  in CNF:
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨  b^{1, 1104}_2
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_1
c     b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨  b^{1, 1104}_0
c  in DIMACS:
 4469  4470  4471  1103  4472 0
 4469  4470  4471  1103 -4473 0
 4469  4470  4471  1103  4474 0

c  -1-1 --> -2
c    ( b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧ -p_1103) -> ( b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0)
c  in CNF:
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨  b^{1, 1104}_2
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨  b^{1, 1104}_1
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨  p_1103 ∨ -b^{1, 1104}_0
c  in DIMACS:
-4469  4470 -4471  1103  4472 0
-4469  4470 -4471  1103  4473 0
-4469  4470 -4471  1103 -4474 0

c  -2-1 --> break 
c    ( b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧ -p_1103) -> break
c  in CNF:
c    -b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨  p_1103 ∨ break
c  in DIMACS:
-4469 -4470  4471  1103 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1103}_2 ∧ -b^{1, 1103}_1 ∧ -b^{1, 1103}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1103}_2 ∨  b^{1, 1103}_1 ∨  b^{1, 1103}_0 ∨ false 
c  in DIMACS:
-4469  4470  4471  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧ true) 
c  in CNF:
c     b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ false 
c  in DIMACS:
 4469 -4470 -4471  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1103}_2 ∧  b^{1, 1103}_1 ∧  b^{1, 1103}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1103}_2 ∨ -b^{1, 1103}_1 ∨ -b^{1, 1103}_0 ∨ false 
c  in DIMACS:
-4469 -4470 -4471  0

c i = 1104
c  -2+1 --> -1
c    ( b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧  p_1104) -> ( b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0)
c  in CNF:
c    -b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨  b^{1, 1105}_2
c    -b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_1
c    -b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨  b^{1, 1105}_0
c  in DIMACS:
-4472 -4473  4474 -1104  4475 0
-4472 -4473  4474 -1104 -4476 0
-4472 -4473  4474 -1104  4477 0

c  -1+1 --> 0
c    ( b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧  p_1104) -> (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧ -b^{1, 1105}_0)
c  in CNF:
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_2
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_1
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_0
c  in DIMACS:
-4472  4473 -4474 -1104 -4475 0
-4472  4473 -4474 -1104 -4476 0
-4472  4473 -4474 -1104 -4477 0

c  0+1 --> 1
c    (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧  p_1104) -> (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0)
c  in CNF:
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_2
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_1
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨  b^{1, 1105}_0
c  in DIMACS:
 4472  4473  4474 -1104 -4475 0
 4472  4473  4474 -1104 -4476 0
 4472  4473  4474 -1104  4477 0

c  1+1 --> 2
c    (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧  p_1104) -> (-b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0)
c  in CNF:
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_2
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨  b^{1, 1105}_1
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ -p_1104 ∨ -b^{1, 1105}_0
c  in DIMACS:
 4472  4473 -4474 -1104 -4475 0
 4472  4473 -4474 -1104  4476 0
 4472  4473 -4474 -1104 -4477 0

c  2+1 --> break 
c    (-b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 4472 -4473  4474 -1104 1162 0


c  2-1 --> 1
c    (-b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧ -p_1104) -> (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0)
c  in CNF:
c     b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_2
c     b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_1
c     b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨  b^{1, 1105}_0
c  in DIMACS:
 4472 -4473  4474  1104 -4475 0
 4472 -4473  4474  1104 -4476 0
 4472 -4473  4474  1104  4477 0

c  1-1 --> 0
c    (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧ -p_1104) -> (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧ -b^{1, 1105}_0)
c  in CNF:
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_2
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_1
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_0
c  in DIMACS:
 4472  4473 -4474  1104 -4475 0
 4472  4473 -4474  1104 -4476 0
 4472  4473 -4474  1104 -4477 0

c  0-1 --> -1
c    (-b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧ -p_1104) -> ( b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0)
c  in CNF:
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨  b^{1, 1105}_2
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_1
c     b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨  b^{1, 1105}_0
c  in DIMACS:
 4472  4473  4474  1104  4475 0
 4472  4473  4474  1104 -4476 0
 4472  4473  4474  1104  4477 0

c  -1-1 --> -2
c    ( b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧ -p_1104) -> ( b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0)
c  in CNF:
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨  b^{1, 1105}_2
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨  b^{1, 1105}_1
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨  p_1104 ∨ -b^{1, 1105}_0
c  in DIMACS:
-4472  4473 -4474  1104  4475 0
-4472  4473 -4474  1104  4476 0
-4472  4473 -4474  1104 -4477 0

c  -2-1 --> break 
c    ( b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-4472 -4473  4474  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1104}_2 ∧ -b^{1, 1104}_1 ∧ -b^{1, 1104}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1104}_2 ∨  b^{1, 1104}_1 ∨  b^{1, 1104}_0 ∨ false 
c  in DIMACS:
-4472  4473  4474  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧ true) 
c  in CNF:
c     b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ false 
c  in DIMACS:
 4472 -4473 -4474  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1104}_2 ∧  b^{1, 1104}_1 ∧  b^{1, 1104}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1104}_2 ∨ -b^{1, 1104}_1 ∨ -b^{1, 1104}_0 ∨ false 
c  in DIMACS:
-4472 -4473 -4474  0

c i = 1105
c  -2+1 --> -1
c    ( b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧  p_1105) -> ( b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0)
c  in CNF:
c    -b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨  b^{1, 1106}_2
c    -b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_1
c    -b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨  b^{1, 1106}_0
c  in DIMACS:
-4475 -4476  4477 -1105  4478 0
-4475 -4476  4477 -1105 -4479 0
-4475 -4476  4477 -1105  4480 0

c  -1+1 --> 0
c    ( b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧  p_1105) -> (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧ -b^{1, 1106}_0)
c  in CNF:
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_2
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_1
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_0
c  in DIMACS:
-4475  4476 -4477 -1105 -4478 0
-4475  4476 -4477 -1105 -4479 0
-4475  4476 -4477 -1105 -4480 0

c  0+1 --> 1
c    (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧  p_1105) -> (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0)
c  in CNF:
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_2
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_1
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨  b^{1, 1106}_0
c  in DIMACS:
 4475  4476  4477 -1105 -4478 0
 4475  4476  4477 -1105 -4479 0
 4475  4476  4477 -1105  4480 0

c  1+1 --> 2
c    (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧  p_1105) -> (-b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0)
c  in CNF:
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_2
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨  b^{1, 1106}_1
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ -p_1105 ∨ -b^{1, 1106}_0
c  in DIMACS:
 4475  4476 -4477 -1105 -4478 0
 4475  4476 -4477 -1105  4479 0
 4475  4476 -4477 -1105 -4480 0

c  2+1 --> break 
c    (-b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 4475 -4476  4477 -1105 1162 0


c  2-1 --> 1
c    (-b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧ -p_1105) -> (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0)
c  in CNF:
c     b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_2
c     b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_1
c     b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨  b^{1, 1106}_0
c  in DIMACS:
 4475 -4476  4477  1105 -4478 0
 4475 -4476  4477  1105 -4479 0
 4475 -4476  4477  1105  4480 0

c  1-1 --> 0
c    (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧ -p_1105) -> (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧ -b^{1, 1106}_0)
c  in CNF:
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_2
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_1
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_0
c  in DIMACS:
 4475  4476 -4477  1105 -4478 0
 4475  4476 -4477  1105 -4479 0
 4475  4476 -4477  1105 -4480 0

c  0-1 --> -1
c    (-b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧ -p_1105) -> ( b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0)
c  in CNF:
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨  b^{1, 1106}_2
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_1
c     b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨  b^{1, 1106}_0
c  in DIMACS:
 4475  4476  4477  1105  4478 0
 4475  4476  4477  1105 -4479 0
 4475  4476  4477  1105  4480 0

c  -1-1 --> -2
c    ( b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧ -p_1105) -> ( b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0)
c  in CNF:
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨  b^{1, 1106}_2
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨  b^{1, 1106}_1
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨  p_1105 ∨ -b^{1, 1106}_0
c  in DIMACS:
-4475  4476 -4477  1105  4478 0
-4475  4476 -4477  1105  4479 0
-4475  4476 -4477  1105 -4480 0

c  -2-1 --> break 
c    ( b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-4475 -4476  4477  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1105}_2 ∧ -b^{1, 1105}_1 ∧ -b^{1, 1105}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1105}_2 ∨  b^{1, 1105}_1 ∨  b^{1, 1105}_0 ∨ false 
c  in DIMACS:
-4475  4476  4477  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧ true) 
c  in CNF:
c     b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ false 
c  in DIMACS:
 4475 -4476 -4477  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1105}_2 ∧  b^{1, 1105}_1 ∧  b^{1, 1105}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1105}_2 ∨ -b^{1, 1105}_1 ∨ -b^{1, 1105}_0 ∨ false 
c  in DIMACS:
-4475 -4476 -4477  0

c i = 1106
c  -2+1 --> -1
c    ( b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧  p_1106) -> ( b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0)
c  in CNF:
c    -b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨  b^{1, 1107}_2
c    -b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_1
c    -b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨  b^{1, 1107}_0
c  in DIMACS:
-4478 -4479  4480 -1106  4481 0
-4478 -4479  4480 -1106 -4482 0
-4478 -4479  4480 -1106  4483 0

c  -1+1 --> 0
c    ( b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧  p_1106) -> (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧ -b^{1, 1107}_0)
c  in CNF:
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_2
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_1
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_0
c  in DIMACS:
-4478  4479 -4480 -1106 -4481 0
-4478  4479 -4480 -1106 -4482 0
-4478  4479 -4480 -1106 -4483 0

c  0+1 --> 1
c    (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧  p_1106) -> (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0)
c  in CNF:
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_2
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_1
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨  b^{1, 1107}_0
c  in DIMACS:
 4478  4479  4480 -1106 -4481 0
 4478  4479  4480 -1106 -4482 0
 4478  4479  4480 -1106  4483 0

c  1+1 --> 2
c    (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧  p_1106) -> (-b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0)
c  in CNF:
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_2
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨  b^{1, 1107}_1
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ -p_1106 ∨ -b^{1, 1107}_0
c  in DIMACS:
 4478  4479 -4480 -1106 -4481 0
 4478  4479 -4480 -1106  4482 0
 4478  4479 -4480 -1106 -4483 0

c  2+1 --> break 
c    (-b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 4478 -4479  4480 -1106 1162 0


c  2-1 --> 1
c    (-b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧ -p_1106) -> (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0)
c  in CNF:
c     b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_2
c     b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_1
c     b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨  b^{1, 1107}_0
c  in DIMACS:
 4478 -4479  4480  1106 -4481 0
 4478 -4479  4480  1106 -4482 0
 4478 -4479  4480  1106  4483 0

c  1-1 --> 0
c    (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧ -p_1106) -> (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧ -b^{1, 1107}_0)
c  in CNF:
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_2
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_1
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_0
c  in DIMACS:
 4478  4479 -4480  1106 -4481 0
 4478  4479 -4480  1106 -4482 0
 4478  4479 -4480  1106 -4483 0

c  0-1 --> -1
c    (-b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧ -p_1106) -> ( b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0)
c  in CNF:
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨  b^{1, 1107}_2
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_1
c     b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨  b^{1, 1107}_0
c  in DIMACS:
 4478  4479  4480  1106  4481 0
 4478  4479  4480  1106 -4482 0
 4478  4479  4480  1106  4483 0

c  -1-1 --> -2
c    ( b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧ -p_1106) -> ( b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0)
c  in CNF:
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨  b^{1, 1107}_2
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨  b^{1, 1107}_1
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨  p_1106 ∨ -b^{1, 1107}_0
c  in DIMACS:
-4478  4479 -4480  1106  4481 0
-4478  4479 -4480  1106  4482 0
-4478  4479 -4480  1106 -4483 0

c  -2-1 --> break 
c    ( b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-4478 -4479  4480  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1106}_2 ∧ -b^{1, 1106}_1 ∧ -b^{1, 1106}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1106}_2 ∨  b^{1, 1106}_1 ∨  b^{1, 1106}_0 ∨ false 
c  in DIMACS:
-4478  4479  4480  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧ true) 
c  in CNF:
c     b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ false 
c  in DIMACS:
 4478 -4479 -4480  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1106}_2 ∧  b^{1, 1106}_1 ∧  b^{1, 1106}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1106}_2 ∨ -b^{1, 1106}_1 ∨ -b^{1, 1106}_0 ∨ false 
c  in DIMACS:
-4478 -4479 -4480  0

c i = 1107
c  -2+1 --> -1
c    ( b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧  p_1107) -> ( b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0)
c  in CNF:
c    -b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨  b^{1, 1108}_2
c    -b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_1
c    -b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨  b^{1, 1108}_0
c  in DIMACS:
-4481 -4482  4483 -1107  4484 0
-4481 -4482  4483 -1107 -4485 0
-4481 -4482  4483 -1107  4486 0

c  -1+1 --> 0
c    ( b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧  p_1107) -> (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧ -b^{1, 1108}_0)
c  in CNF:
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_2
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_1
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_0
c  in DIMACS:
-4481  4482 -4483 -1107 -4484 0
-4481  4482 -4483 -1107 -4485 0
-4481  4482 -4483 -1107 -4486 0

c  0+1 --> 1
c    (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧  p_1107) -> (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0)
c  in CNF:
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_2
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_1
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨  b^{1, 1108}_0
c  in DIMACS:
 4481  4482  4483 -1107 -4484 0
 4481  4482  4483 -1107 -4485 0
 4481  4482  4483 -1107  4486 0

c  1+1 --> 2
c    (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧  p_1107) -> (-b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0)
c  in CNF:
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_2
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨  b^{1, 1108}_1
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ -p_1107 ∨ -b^{1, 1108}_0
c  in DIMACS:
 4481  4482 -4483 -1107 -4484 0
 4481  4482 -4483 -1107  4485 0
 4481  4482 -4483 -1107 -4486 0

c  2+1 --> break 
c    (-b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 4481 -4482  4483 -1107 1162 0


c  2-1 --> 1
c    (-b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧ -p_1107) -> (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0)
c  in CNF:
c     b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_2
c     b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_1
c     b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨  b^{1, 1108}_0
c  in DIMACS:
 4481 -4482  4483  1107 -4484 0
 4481 -4482  4483  1107 -4485 0
 4481 -4482  4483  1107  4486 0

c  1-1 --> 0
c    (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧ -p_1107) -> (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧ -b^{1, 1108}_0)
c  in CNF:
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_2
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_1
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_0
c  in DIMACS:
 4481  4482 -4483  1107 -4484 0
 4481  4482 -4483  1107 -4485 0
 4481  4482 -4483  1107 -4486 0

c  0-1 --> -1
c    (-b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧ -p_1107) -> ( b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0)
c  in CNF:
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨  b^{1, 1108}_2
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_1
c     b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨  b^{1, 1108}_0
c  in DIMACS:
 4481  4482  4483  1107  4484 0
 4481  4482  4483  1107 -4485 0
 4481  4482  4483  1107  4486 0

c  -1-1 --> -2
c    ( b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧ -p_1107) -> ( b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0)
c  in CNF:
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨  b^{1, 1108}_2
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨  b^{1, 1108}_1
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨  p_1107 ∨ -b^{1, 1108}_0
c  in DIMACS:
-4481  4482 -4483  1107  4484 0
-4481  4482 -4483  1107  4485 0
-4481  4482 -4483  1107 -4486 0

c  -2-1 --> break 
c    ( b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-4481 -4482  4483  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1107}_2 ∧ -b^{1, 1107}_1 ∧ -b^{1, 1107}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1107}_2 ∨  b^{1, 1107}_1 ∨  b^{1, 1107}_0 ∨ false 
c  in DIMACS:
-4481  4482  4483  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧ true) 
c  in CNF:
c     b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ false 
c  in DIMACS:
 4481 -4482 -4483  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1107}_2 ∧  b^{1, 1107}_1 ∧  b^{1, 1107}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1107}_2 ∨ -b^{1, 1107}_1 ∨ -b^{1, 1107}_0 ∨ false 
c  in DIMACS:
-4481 -4482 -4483  0

c i = 1108
c  -2+1 --> -1
c    ( b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧  p_1108) -> ( b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0)
c  in CNF:
c    -b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨  b^{1, 1109}_2
c    -b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_1
c    -b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨  b^{1, 1109}_0
c  in DIMACS:
-4484 -4485  4486 -1108  4487 0
-4484 -4485  4486 -1108 -4488 0
-4484 -4485  4486 -1108  4489 0

c  -1+1 --> 0
c    ( b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧  p_1108) -> (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧ -b^{1, 1109}_0)
c  in CNF:
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_2
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_1
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_0
c  in DIMACS:
-4484  4485 -4486 -1108 -4487 0
-4484  4485 -4486 -1108 -4488 0
-4484  4485 -4486 -1108 -4489 0

c  0+1 --> 1
c    (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧  p_1108) -> (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0)
c  in CNF:
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_2
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_1
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨  b^{1, 1109}_0
c  in DIMACS:
 4484  4485  4486 -1108 -4487 0
 4484  4485  4486 -1108 -4488 0
 4484  4485  4486 -1108  4489 0

c  1+1 --> 2
c    (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧  p_1108) -> (-b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0)
c  in CNF:
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_2
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨  b^{1, 1109}_1
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ -p_1108 ∨ -b^{1, 1109}_0
c  in DIMACS:
 4484  4485 -4486 -1108 -4487 0
 4484  4485 -4486 -1108  4488 0
 4484  4485 -4486 -1108 -4489 0

c  2+1 --> break 
c    (-b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧  p_1108) -> break
c  in CNF:
c     b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ -p_1108 ∨ break
c  in DIMACS:
 4484 -4485  4486 -1108 1162 0


c  2-1 --> 1
c    (-b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧ -p_1108) -> (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0)
c  in CNF:
c     b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_2
c     b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_1
c     b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨  b^{1, 1109}_0
c  in DIMACS:
 4484 -4485  4486  1108 -4487 0
 4484 -4485  4486  1108 -4488 0
 4484 -4485  4486  1108  4489 0

c  1-1 --> 0
c    (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧ -p_1108) -> (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧ -b^{1, 1109}_0)
c  in CNF:
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_2
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_1
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_0
c  in DIMACS:
 4484  4485 -4486  1108 -4487 0
 4484  4485 -4486  1108 -4488 0
 4484  4485 -4486  1108 -4489 0

c  0-1 --> -1
c    (-b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧ -p_1108) -> ( b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0)
c  in CNF:
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨  b^{1, 1109}_2
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_1
c     b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨  b^{1, 1109}_0
c  in DIMACS:
 4484  4485  4486  1108  4487 0
 4484  4485  4486  1108 -4488 0
 4484  4485  4486  1108  4489 0

c  -1-1 --> -2
c    ( b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧ -p_1108) -> ( b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0)
c  in CNF:
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨  b^{1, 1109}_2
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨  b^{1, 1109}_1
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨  p_1108 ∨ -b^{1, 1109}_0
c  in DIMACS:
-4484  4485 -4486  1108  4487 0
-4484  4485 -4486  1108  4488 0
-4484  4485 -4486  1108 -4489 0

c  -2-1 --> break 
c    ( b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧ -p_1108) -> break
c  in CNF:
c    -b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨  p_1108 ∨ break
c  in DIMACS:
-4484 -4485  4486  1108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1108}_2 ∧ -b^{1, 1108}_1 ∧ -b^{1, 1108}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1108}_2 ∨  b^{1, 1108}_1 ∨  b^{1, 1108}_0 ∨ false 
c  in DIMACS:
-4484  4485  4486  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧ true) 
c  in CNF:
c     b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ false 
c  in DIMACS:
 4484 -4485 -4486  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1108}_2 ∧  b^{1, 1108}_1 ∧  b^{1, 1108}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1108}_2 ∨ -b^{1, 1108}_1 ∨ -b^{1, 1108}_0 ∨ false 
c  in DIMACS:
-4484 -4485 -4486  0

c i = 1109
c  -2+1 --> -1
c    ( b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧  p_1109) -> ( b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0)
c  in CNF:
c    -b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨  b^{1, 1110}_2
c    -b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_1
c    -b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨  b^{1, 1110}_0
c  in DIMACS:
-4487 -4488  4489 -1109  4490 0
-4487 -4488  4489 -1109 -4491 0
-4487 -4488  4489 -1109  4492 0

c  -1+1 --> 0
c    ( b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧  p_1109) -> (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧ -b^{1, 1110}_0)
c  in CNF:
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_2
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_1
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_0
c  in DIMACS:
-4487  4488 -4489 -1109 -4490 0
-4487  4488 -4489 -1109 -4491 0
-4487  4488 -4489 -1109 -4492 0

c  0+1 --> 1
c    (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧  p_1109) -> (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0)
c  in CNF:
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_2
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_1
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨  b^{1, 1110}_0
c  in DIMACS:
 4487  4488  4489 -1109 -4490 0
 4487  4488  4489 -1109 -4491 0
 4487  4488  4489 -1109  4492 0

c  1+1 --> 2
c    (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧  p_1109) -> (-b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0)
c  in CNF:
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_2
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨  b^{1, 1110}_1
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ -p_1109 ∨ -b^{1, 1110}_0
c  in DIMACS:
 4487  4488 -4489 -1109 -4490 0
 4487  4488 -4489 -1109  4491 0
 4487  4488 -4489 -1109 -4492 0

c  2+1 --> break 
c    (-b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧  p_1109) -> break
c  in CNF:
c     b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ -p_1109 ∨ break
c  in DIMACS:
 4487 -4488  4489 -1109 1162 0


c  2-1 --> 1
c    (-b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧ -p_1109) -> (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0)
c  in CNF:
c     b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_2
c     b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_1
c     b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨  b^{1, 1110}_0
c  in DIMACS:
 4487 -4488  4489  1109 -4490 0
 4487 -4488  4489  1109 -4491 0
 4487 -4488  4489  1109  4492 0

c  1-1 --> 0
c    (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧ -p_1109) -> (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧ -b^{1, 1110}_0)
c  in CNF:
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_2
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_1
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_0
c  in DIMACS:
 4487  4488 -4489  1109 -4490 0
 4487  4488 -4489  1109 -4491 0
 4487  4488 -4489  1109 -4492 0

c  0-1 --> -1
c    (-b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧ -p_1109) -> ( b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0)
c  in CNF:
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨  b^{1, 1110}_2
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_1
c     b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨  b^{1, 1110}_0
c  in DIMACS:
 4487  4488  4489  1109  4490 0
 4487  4488  4489  1109 -4491 0
 4487  4488  4489  1109  4492 0

c  -1-1 --> -2
c    ( b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧ -p_1109) -> ( b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0)
c  in CNF:
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨  b^{1, 1110}_2
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨  b^{1, 1110}_1
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨  p_1109 ∨ -b^{1, 1110}_0
c  in DIMACS:
-4487  4488 -4489  1109  4490 0
-4487  4488 -4489  1109  4491 0
-4487  4488 -4489  1109 -4492 0

c  -2-1 --> break 
c    ( b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧ -p_1109) -> break
c  in CNF:
c    -b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨  p_1109 ∨ break
c  in DIMACS:
-4487 -4488  4489  1109 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1109}_2 ∧ -b^{1, 1109}_1 ∧ -b^{1, 1109}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1109}_2 ∨  b^{1, 1109}_1 ∨  b^{1, 1109}_0 ∨ false 
c  in DIMACS:
-4487  4488  4489  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧ true) 
c  in CNF:
c     b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ false 
c  in DIMACS:
 4487 -4488 -4489  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1109}_2 ∧  b^{1, 1109}_1 ∧  b^{1, 1109}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1109}_2 ∨ -b^{1, 1109}_1 ∨ -b^{1, 1109}_0 ∨ false 
c  in DIMACS:
-4487 -4488 -4489  0

c i = 1110
c  -2+1 --> -1
c    ( b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧  p_1110) -> ( b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0)
c  in CNF:
c    -b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨  b^{1, 1111}_2
c    -b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_1
c    -b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨  b^{1, 1111}_0
c  in DIMACS:
-4490 -4491  4492 -1110  4493 0
-4490 -4491  4492 -1110 -4494 0
-4490 -4491  4492 -1110  4495 0

c  -1+1 --> 0
c    ( b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧  p_1110) -> (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧ -b^{1, 1111}_0)
c  in CNF:
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_2
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_1
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_0
c  in DIMACS:
-4490  4491 -4492 -1110 -4493 0
-4490  4491 -4492 -1110 -4494 0
-4490  4491 -4492 -1110 -4495 0

c  0+1 --> 1
c    (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧  p_1110) -> (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0)
c  in CNF:
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_2
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_1
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨  b^{1, 1111}_0
c  in DIMACS:
 4490  4491  4492 -1110 -4493 0
 4490  4491  4492 -1110 -4494 0
 4490  4491  4492 -1110  4495 0

c  1+1 --> 2
c    (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧  p_1110) -> (-b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0)
c  in CNF:
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_2
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨  b^{1, 1111}_1
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ -p_1110 ∨ -b^{1, 1111}_0
c  in DIMACS:
 4490  4491 -4492 -1110 -4493 0
 4490  4491 -4492 -1110  4494 0
 4490  4491 -4492 -1110 -4495 0

c  2+1 --> break 
c    (-b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 4490 -4491  4492 -1110 1162 0


c  2-1 --> 1
c    (-b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧ -p_1110) -> (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0)
c  in CNF:
c     b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_2
c     b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_1
c     b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨  b^{1, 1111}_0
c  in DIMACS:
 4490 -4491  4492  1110 -4493 0
 4490 -4491  4492  1110 -4494 0
 4490 -4491  4492  1110  4495 0

c  1-1 --> 0
c    (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧ -p_1110) -> (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧ -b^{1, 1111}_0)
c  in CNF:
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_2
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_1
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_0
c  in DIMACS:
 4490  4491 -4492  1110 -4493 0
 4490  4491 -4492  1110 -4494 0
 4490  4491 -4492  1110 -4495 0

c  0-1 --> -1
c    (-b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧ -p_1110) -> ( b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0)
c  in CNF:
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨  b^{1, 1111}_2
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_1
c     b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨  b^{1, 1111}_0
c  in DIMACS:
 4490  4491  4492  1110  4493 0
 4490  4491  4492  1110 -4494 0
 4490  4491  4492  1110  4495 0

c  -1-1 --> -2
c    ( b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧ -p_1110) -> ( b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0)
c  in CNF:
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨  b^{1, 1111}_2
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨  b^{1, 1111}_1
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨  p_1110 ∨ -b^{1, 1111}_0
c  in DIMACS:
-4490  4491 -4492  1110  4493 0
-4490  4491 -4492  1110  4494 0
-4490  4491 -4492  1110 -4495 0

c  -2-1 --> break 
c    ( b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-4490 -4491  4492  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1110}_2 ∧ -b^{1, 1110}_1 ∧ -b^{1, 1110}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1110}_2 ∨  b^{1, 1110}_1 ∨  b^{1, 1110}_0 ∨ false 
c  in DIMACS:
-4490  4491  4492  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧ true) 
c  in CNF:
c     b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ false 
c  in DIMACS:
 4490 -4491 -4492  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1110}_2 ∧  b^{1, 1110}_1 ∧  b^{1, 1110}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1110}_2 ∨ -b^{1, 1110}_1 ∨ -b^{1, 1110}_0 ∨ false 
c  in DIMACS:
-4490 -4491 -4492  0

c i = 1111
c  -2+1 --> -1
c    ( b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧  p_1111) -> ( b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0)
c  in CNF:
c    -b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨  b^{1, 1112}_2
c    -b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_1
c    -b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨  b^{1, 1112}_0
c  in DIMACS:
-4493 -4494  4495 -1111  4496 0
-4493 -4494  4495 -1111 -4497 0
-4493 -4494  4495 -1111  4498 0

c  -1+1 --> 0
c    ( b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧  p_1111) -> (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧ -b^{1, 1112}_0)
c  in CNF:
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_2
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_1
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_0
c  in DIMACS:
-4493  4494 -4495 -1111 -4496 0
-4493  4494 -4495 -1111 -4497 0
-4493  4494 -4495 -1111 -4498 0

c  0+1 --> 1
c    (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧  p_1111) -> (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0)
c  in CNF:
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_2
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_1
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨  b^{1, 1112}_0
c  in DIMACS:
 4493  4494  4495 -1111 -4496 0
 4493  4494  4495 -1111 -4497 0
 4493  4494  4495 -1111  4498 0

c  1+1 --> 2
c    (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧  p_1111) -> (-b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0)
c  in CNF:
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_2
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨  b^{1, 1112}_1
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ -p_1111 ∨ -b^{1, 1112}_0
c  in DIMACS:
 4493  4494 -4495 -1111 -4496 0
 4493  4494 -4495 -1111  4497 0
 4493  4494 -4495 -1111 -4498 0

c  2+1 --> break 
c    (-b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧  p_1111) -> break
c  in CNF:
c     b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ -p_1111 ∨ break
c  in DIMACS:
 4493 -4494  4495 -1111 1162 0


c  2-1 --> 1
c    (-b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧ -p_1111) -> (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0)
c  in CNF:
c     b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_2
c     b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_1
c     b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨  b^{1, 1112}_0
c  in DIMACS:
 4493 -4494  4495  1111 -4496 0
 4493 -4494  4495  1111 -4497 0
 4493 -4494  4495  1111  4498 0

c  1-1 --> 0
c    (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧ -p_1111) -> (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧ -b^{1, 1112}_0)
c  in CNF:
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_2
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_1
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_0
c  in DIMACS:
 4493  4494 -4495  1111 -4496 0
 4493  4494 -4495  1111 -4497 0
 4493  4494 -4495  1111 -4498 0

c  0-1 --> -1
c    (-b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧ -p_1111) -> ( b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0)
c  in CNF:
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨  b^{1, 1112}_2
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_1
c     b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨  b^{1, 1112}_0
c  in DIMACS:
 4493  4494  4495  1111  4496 0
 4493  4494  4495  1111 -4497 0
 4493  4494  4495  1111  4498 0

c  -1-1 --> -2
c    ( b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧ -p_1111) -> ( b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0)
c  in CNF:
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨  b^{1, 1112}_2
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨  b^{1, 1112}_1
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨  p_1111 ∨ -b^{1, 1112}_0
c  in DIMACS:
-4493  4494 -4495  1111  4496 0
-4493  4494 -4495  1111  4497 0
-4493  4494 -4495  1111 -4498 0

c  -2-1 --> break 
c    ( b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧ -p_1111) -> break
c  in CNF:
c    -b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨  p_1111 ∨ break
c  in DIMACS:
-4493 -4494  4495  1111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1111}_2 ∧ -b^{1, 1111}_1 ∧ -b^{1, 1111}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1111}_2 ∨  b^{1, 1111}_1 ∨  b^{1, 1111}_0 ∨ false 
c  in DIMACS:
-4493  4494  4495  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧ true) 
c  in CNF:
c     b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ false 
c  in DIMACS:
 4493 -4494 -4495  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1111}_2 ∧  b^{1, 1111}_1 ∧  b^{1, 1111}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1111}_2 ∨ -b^{1, 1111}_1 ∨ -b^{1, 1111}_0 ∨ false 
c  in DIMACS:
-4493 -4494 -4495  0

c i = 1112
c  -2+1 --> -1
c    ( b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧  p_1112) -> ( b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0)
c  in CNF:
c    -b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨  b^{1, 1113}_2
c    -b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_1
c    -b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨  b^{1, 1113}_0
c  in DIMACS:
-4496 -4497  4498 -1112  4499 0
-4496 -4497  4498 -1112 -4500 0
-4496 -4497  4498 -1112  4501 0

c  -1+1 --> 0
c    ( b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧  p_1112) -> (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧ -b^{1, 1113}_0)
c  in CNF:
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_2
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_1
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_0
c  in DIMACS:
-4496  4497 -4498 -1112 -4499 0
-4496  4497 -4498 -1112 -4500 0
-4496  4497 -4498 -1112 -4501 0

c  0+1 --> 1
c    (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧  p_1112) -> (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0)
c  in CNF:
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_2
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_1
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨  b^{1, 1113}_0
c  in DIMACS:
 4496  4497  4498 -1112 -4499 0
 4496  4497  4498 -1112 -4500 0
 4496  4497  4498 -1112  4501 0

c  1+1 --> 2
c    (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧  p_1112) -> (-b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0)
c  in CNF:
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_2
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨  b^{1, 1113}_1
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ -p_1112 ∨ -b^{1, 1113}_0
c  in DIMACS:
 4496  4497 -4498 -1112 -4499 0
 4496  4497 -4498 -1112  4500 0
 4496  4497 -4498 -1112 -4501 0

c  2+1 --> break 
c    (-b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 4496 -4497  4498 -1112 1162 0


c  2-1 --> 1
c    (-b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧ -p_1112) -> (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0)
c  in CNF:
c     b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_2
c     b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_1
c     b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨  b^{1, 1113}_0
c  in DIMACS:
 4496 -4497  4498  1112 -4499 0
 4496 -4497  4498  1112 -4500 0
 4496 -4497  4498  1112  4501 0

c  1-1 --> 0
c    (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧ -p_1112) -> (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧ -b^{1, 1113}_0)
c  in CNF:
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_2
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_1
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_0
c  in DIMACS:
 4496  4497 -4498  1112 -4499 0
 4496  4497 -4498  1112 -4500 0
 4496  4497 -4498  1112 -4501 0

c  0-1 --> -1
c    (-b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧ -p_1112) -> ( b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0)
c  in CNF:
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨  b^{1, 1113}_2
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_1
c     b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨  b^{1, 1113}_0
c  in DIMACS:
 4496  4497  4498  1112  4499 0
 4496  4497  4498  1112 -4500 0
 4496  4497  4498  1112  4501 0

c  -1-1 --> -2
c    ( b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧ -p_1112) -> ( b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0)
c  in CNF:
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨  b^{1, 1113}_2
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨  b^{1, 1113}_1
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨  p_1112 ∨ -b^{1, 1113}_0
c  in DIMACS:
-4496  4497 -4498  1112  4499 0
-4496  4497 -4498  1112  4500 0
-4496  4497 -4498  1112 -4501 0

c  -2-1 --> break 
c    ( b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-4496 -4497  4498  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1112}_2 ∧ -b^{1, 1112}_1 ∧ -b^{1, 1112}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1112}_2 ∨  b^{1, 1112}_1 ∨  b^{1, 1112}_0 ∨ false 
c  in DIMACS:
-4496  4497  4498  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧ true) 
c  in CNF:
c     b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ false 
c  in DIMACS:
 4496 -4497 -4498  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1112}_2 ∧  b^{1, 1112}_1 ∧  b^{1, 1112}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1112}_2 ∨ -b^{1, 1112}_1 ∨ -b^{1, 1112}_0 ∨ false 
c  in DIMACS:
-4496 -4497 -4498  0

c i = 1113
c  -2+1 --> -1
c    ( b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧  p_1113) -> ( b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0)
c  in CNF:
c    -b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨  b^{1, 1114}_2
c    -b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_1
c    -b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨  b^{1, 1114}_0
c  in DIMACS:
-4499 -4500  4501 -1113  4502 0
-4499 -4500  4501 -1113 -4503 0
-4499 -4500  4501 -1113  4504 0

c  -1+1 --> 0
c    ( b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧  p_1113) -> (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧ -b^{1, 1114}_0)
c  in CNF:
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_2
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_1
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_0
c  in DIMACS:
-4499  4500 -4501 -1113 -4502 0
-4499  4500 -4501 -1113 -4503 0
-4499  4500 -4501 -1113 -4504 0

c  0+1 --> 1
c    (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧  p_1113) -> (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0)
c  in CNF:
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_2
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_1
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨  b^{1, 1114}_0
c  in DIMACS:
 4499  4500  4501 -1113 -4502 0
 4499  4500  4501 -1113 -4503 0
 4499  4500  4501 -1113  4504 0

c  1+1 --> 2
c    (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧  p_1113) -> (-b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0)
c  in CNF:
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_2
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨  b^{1, 1114}_1
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ -p_1113 ∨ -b^{1, 1114}_0
c  in DIMACS:
 4499  4500 -4501 -1113 -4502 0
 4499  4500 -4501 -1113  4503 0
 4499  4500 -4501 -1113 -4504 0

c  2+1 --> break 
c    (-b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 4499 -4500  4501 -1113 1162 0


c  2-1 --> 1
c    (-b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧ -p_1113) -> (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0)
c  in CNF:
c     b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_2
c     b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_1
c     b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨  b^{1, 1114}_0
c  in DIMACS:
 4499 -4500  4501  1113 -4502 0
 4499 -4500  4501  1113 -4503 0
 4499 -4500  4501  1113  4504 0

c  1-1 --> 0
c    (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧ -p_1113) -> (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧ -b^{1, 1114}_0)
c  in CNF:
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_2
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_1
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_0
c  in DIMACS:
 4499  4500 -4501  1113 -4502 0
 4499  4500 -4501  1113 -4503 0
 4499  4500 -4501  1113 -4504 0

c  0-1 --> -1
c    (-b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧ -p_1113) -> ( b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0)
c  in CNF:
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨  b^{1, 1114}_2
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_1
c     b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨  b^{1, 1114}_0
c  in DIMACS:
 4499  4500  4501  1113  4502 0
 4499  4500  4501  1113 -4503 0
 4499  4500  4501  1113  4504 0

c  -1-1 --> -2
c    ( b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧ -p_1113) -> ( b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0)
c  in CNF:
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨  b^{1, 1114}_2
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨  b^{1, 1114}_1
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨  p_1113 ∨ -b^{1, 1114}_0
c  in DIMACS:
-4499  4500 -4501  1113  4502 0
-4499  4500 -4501  1113  4503 0
-4499  4500 -4501  1113 -4504 0

c  -2-1 --> break 
c    ( b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-4499 -4500  4501  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1113}_2 ∧ -b^{1, 1113}_1 ∧ -b^{1, 1113}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1113}_2 ∨  b^{1, 1113}_1 ∨  b^{1, 1113}_0 ∨ false 
c  in DIMACS:
-4499  4500  4501  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧ true) 
c  in CNF:
c     b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ false 
c  in DIMACS:
 4499 -4500 -4501  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1113}_2 ∧  b^{1, 1113}_1 ∧  b^{1, 1113}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1113}_2 ∨ -b^{1, 1113}_1 ∨ -b^{1, 1113}_0 ∨ false 
c  in DIMACS:
-4499 -4500 -4501  0

c i = 1114
c  -2+1 --> -1
c    ( b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧  p_1114) -> ( b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0)
c  in CNF:
c    -b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨  b^{1, 1115}_2
c    -b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_1
c    -b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨  b^{1, 1115}_0
c  in DIMACS:
-4502 -4503  4504 -1114  4505 0
-4502 -4503  4504 -1114 -4506 0
-4502 -4503  4504 -1114  4507 0

c  -1+1 --> 0
c    ( b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧  p_1114) -> (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧ -b^{1, 1115}_0)
c  in CNF:
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_2
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_1
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_0
c  in DIMACS:
-4502  4503 -4504 -1114 -4505 0
-4502  4503 -4504 -1114 -4506 0
-4502  4503 -4504 -1114 -4507 0

c  0+1 --> 1
c    (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧  p_1114) -> (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0)
c  in CNF:
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_2
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_1
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨  b^{1, 1115}_0
c  in DIMACS:
 4502  4503  4504 -1114 -4505 0
 4502  4503  4504 -1114 -4506 0
 4502  4503  4504 -1114  4507 0

c  1+1 --> 2
c    (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧  p_1114) -> (-b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0)
c  in CNF:
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_2
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨  b^{1, 1115}_1
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ -p_1114 ∨ -b^{1, 1115}_0
c  in DIMACS:
 4502  4503 -4504 -1114 -4505 0
 4502  4503 -4504 -1114  4506 0
 4502  4503 -4504 -1114 -4507 0

c  2+1 --> break 
c    (-b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧  p_1114) -> break
c  in CNF:
c     b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ -p_1114 ∨ break
c  in DIMACS:
 4502 -4503  4504 -1114 1162 0


c  2-1 --> 1
c    (-b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧ -p_1114) -> (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0)
c  in CNF:
c     b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_2
c     b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_1
c     b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨  b^{1, 1115}_0
c  in DIMACS:
 4502 -4503  4504  1114 -4505 0
 4502 -4503  4504  1114 -4506 0
 4502 -4503  4504  1114  4507 0

c  1-1 --> 0
c    (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧ -p_1114) -> (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧ -b^{1, 1115}_0)
c  in CNF:
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_2
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_1
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_0
c  in DIMACS:
 4502  4503 -4504  1114 -4505 0
 4502  4503 -4504  1114 -4506 0
 4502  4503 -4504  1114 -4507 0

c  0-1 --> -1
c    (-b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧ -p_1114) -> ( b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0)
c  in CNF:
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨  b^{1, 1115}_2
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_1
c     b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨  b^{1, 1115}_0
c  in DIMACS:
 4502  4503  4504  1114  4505 0
 4502  4503  4504  1114 -4506 0
 4502  4503  4504  1114  4507 0

c  -1-1 --> -2
c    ( b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧ -p_1114) -> ( b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0)
c  in CNF:
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨  b^{1, 1115}_2
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨  b^{1, 1115}_1
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨  p_1114 ∨ -b^{1, 1115}_0
c  in DIMACS:
-4502  4503 -4504  1114  4505 0
-4502  4503 -4504  1114  4506 0
-4502  4503 -4504  1114 -4507 0

c  -2-1 --> break 
c    ( b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧ -p_1114) -> break
c  in CNF:
c    -b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨  p_1114 ∨ break
c  in DIMACS:
-4502 -4503  4504  1114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1114}_2 ∧ -b^{1, 1114}_1 ∧ -b^{1, 1114}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1114}_2 ∨  b^{1, 1114}_1 ∨  b^{1, 1114}_0 ∨ false 
c  in DIMACS:
-4502  4503  4504  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧ true) 
c  in CNF:
c     b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ false 
c  in DIMACS:
 4502 -4503 -4504  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1114}_2 ∧  b^{1, 1114}_1 ∧  b^{1, 1114}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1114}_2 ∨ -b^{1, 1114}_1 ∨ -b^{1, 1114}_0 ∨ false 
c  in DIMACS:
-4502 -4503 -4504  0

c i = 1115
c  -2+1 --> -1
c    ( b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧  p_1115) -> ( b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0)
c  in CNF:
c    -b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨  b^{1, 1116}_2
c    -b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_1
c    -b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨  b^{1, 1116}_0
c  in DIMACS:
-4505 -4506  4507 -1115  4508 0
-4505 -4506  4507 -1115 -4509 0
-4505 -4506  4507 -1115  4510 0

c  -1+1 --> 0
c    ( b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧  p_1115) -> (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧ -b^{1, 1116}_0)
c  in CNF:
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_2
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_1
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_0
c  in DIMACS:
-4505  4506 -4507 -1115 -4508 0
-4505  4506 -4507 -1115 -4509 0
-4505  4506 -4507 -1115 -4510 0

c  0+1 --> 1
c    (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧  p_1115) -> (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0)
c  in CNF:
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_2
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_1
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨  b^{1, 1116}_0
c  in DIMACS:
 4505  4506  4507 -1115 -4508 0
 4505  4506  4507 -1115 -4509 0
 4505  4506  4507 -1115  4510 0

c  1+1 --> 2
c    (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧  p_1115) -> (-b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0)
c  in CNF:
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_2
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨  b^{1, 1116}_1
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ -p_1115 ∨ -b^{1, 1116}_0
c  in DIMACS:
 4505  4506 -4507 -1115 -4508 0
 4505  4506 -4507 -1115  4509 0
 4505  4506 -4507 -1115 -4510 0

c  2+1 --> break 
c    (-b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧  p_1115) -> break
c  in CNF:
c     b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ -p_1115 ∨ break
c  in DIMACS:
 4505 -4506  4507 -1115 1162 0


c  2-1 --> 1
c    (-b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧ -p_1115) -> (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0)
c  in CNF:
c     b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_2
c     b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_1
c     b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨  b^{1, 1116}_0
c  in DIMACS:
 4505 -4506  4507  1115 -4508 0
 4505 -4506  4507  1115 -4509 0
 4505 -4506  4507  1115  4510 0

c  1-1 --> 0
c    (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧ -p_1115) -> (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧ -b^{1, 1116}_0)
c  in CNF:
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_2
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_1
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_0
c  in DIMACS:
 4505  4506 -4507  1115 -4508 0
 4505  4506 -4507  1115 -4509 0
 4505  4506 -4507  1115 -4510 0

c  0-1 --> -1
c    (-b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧ -p_1115) -> ( b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0)
c  in CNF:
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨  b^{1, 1116}_2
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_1
c     b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨  b^{1, 1116}_0
c  in DIMACS:
 4505  4506  4507  1115  4508 0
 4505  4506  4507  1115 -4509 0
 4505  4506  4507  1115  4510 0

c  -1-1 --> -2
c    ( b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧ -p_1115) -> ( b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0)
c  in CNF:
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨  b^{1, 1116}_2
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨  b^{1, 1116}_1
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨  p_1115 ∨ -b^{1, 1116}_0
c  in DIMACS:
-4505  4506 -4507  1115  4508 0
-4505  4506 -4507  1115  4509 0
-4505  4506 -4507  1115 -4510 0

c  -2-1 --> break 
c    ( b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧ -p_1115) -> break
c  in CNF:
c    -b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨  p_1115 ∨ break
c  in DIMACS:
-4505 -4506  4507  1115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1115}_2 ∧ -b^{1, 1115}_1 ∧ -b^{1, 1115}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1115}_2 ∨  b^{1, 1115}_1 ∨  b^{1, 1115}_0 ∨ false 
c  in DIMACS:
-4505  4506  4507  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧ true) 
c  in CNF:
c     b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ false 
c  in DIMACS:
 4505 -4506 -4507  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1115}_2 ∧  b^{1, 1115}_1 ∧  b^{1, 1115}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1115}_2 ∨ -b^{1, 1115}_1 ∨ -b^{1, 1115}_0 ∨ false 
c  in DIMACS:
-4505 -4506 -4507  0

c i = 1116
c  -2+1 --> -1
c    ( b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧  p_1116) -> ( b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0)
c  in CNF:
c    -b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨  b^{1, 1117}_2
c    -b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_1
c    -b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨  b^{1, 1117}_0
c  in DIMACS:
-4508 -4509  4510 -1116  4511 0
-4508 -4509  4510 -1116 -4512 0
-4508 -4509  4510 -1116  4513 0

c  -1+1 --> 0
c    ( b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧  p_1116) -> (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧ -b^{1, 1117}_0)
c  in CNF:
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_2
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_1
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_0
c  in DIMACS:
-4508  4509 -4510 -1116 -4511 0
-4508  4509 -4510 -1116 -4512 0
-4508  4509 -4510 -1116 -4513 0

c  0+1 --> 1
c    (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧  p_1116) -> (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0)
c  in CNF:
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_2
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_1
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨  b^{1, 1117}_0
c  in DIMACS:
 4508  4509  4510 -1116 -4511 0
 4508  4509  4510 -1116 -4512 0
 4508  4509  4510 -1116  4513 0

c  1+1 --> 2
c    (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧  p_1116) -> (-b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0)
c  in CNF:
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_2
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨  b^{1, 1117}_1
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ -p_1116 ∨ -b^{1, 1117}_0
c  in DIMACS:
 4508  4509 -4510 -1116 -4511 0
 4508  4509 -4510 -1116  4512 0
 4508  4509 -4510 -1116 -4513 0

c  2+1 --> break 
c    (-b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 4508 -4509  4510 -1116 1162 0


c  2-1 --> 1
c    (-b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧ -p_1116) -> (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0)
c  in CNF:
c     b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_2
c     b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_1
c     b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨  b^{1, 1117}_0
c  in DIMACS:
 4508 -4509  4510  1116 -4511 0
 4508 -4509  4510  1116 -4512 0
 4508 -4509  4510  1116  4513 0

c  1-1 --> 0
c    (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧ -p_1116) -> (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧ -b^{1, 1117}_0)
c  in CNF:
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_2
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_1
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_0
c  in DIMACS:
 4508  4509 -4510  1116 -4511 0
 4508  4509 -4510  1116 -4512 0
 4508  4509 -4510  1116 -4513 0

c  0-1 --> -1
c    (-b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧ -p_1116) -> ( b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0)
c  in CNF:
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨  b^{1, 1117}_2
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_1
c     b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨  b^{1, 1117}_0
c  in DIMACS:
 4508  4509  4510  1116  4511 0
 4508  4509  4510  1116 -4512 0
 4508  4509  4510  1116  4513 0

c  -1-1 --> -2
c    ( b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧ -p_1116) -> ( b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0)
c  in CNF:
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨  b^{1, 1117}_2
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨  b^{1, 1117}_1
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨  p_1116 ∨ -b^{1, 1117}_0
c  in DIMACS:
-4508  4509 -4510  1116  4511 0
-4508  4509 -4510  1116  4512 0
-4508  4509 -4510  1116 -4513 0

c  -2-1 --> break 
c    ( b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-4508 -4509  4510  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1116}_2 ∧ -b^{1, 1116}_1 ∧ -b^{1, 1116}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1116}_2 ∨  b^{1, 1116}_1 ∨  b^{1, 1116}_0 ∨ false 
c  in DIMACS:
-4508  4509  4510  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧ true) 
c  in CNF:
c     b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ false 
c  in DIMACS:
 4508 -4509 -4510  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1116}_2 ∧  b^{1, 1116}_1 ∧  b^{1, 1116}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1116}_2 ∨ -b^{1, 1116}_1 ∨ -b^{1, 1116}_0 ∨ false 
c  in DIMACS:
-4508 -4509 -4510  0

c i = 1117
c  -2+1 --> -1
c    ( b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧  p_1117) -> ( b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0)
c  in CNF:
c    -b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨  b^{1, 1118}_2
c    -b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_1
c    -b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨  b^{1, 1118}_0
c  in DIMACS:
-4511 -4512  4513 -1117  4514 0
-4511 -4512  4513 -1117 -4515 0
-4511 -4512  4513 -1117  4516 0

c  -1+1 --> 0
c    ( b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧  p_1117) -> (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧ -b^{1, 1118}_0)
c  in CNF:
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_2
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_1
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_0
c  in DIMACS:
-4511  4512 -4513 -1117 -4514 0
-4511  4512 -4513 -1117 -4515 0
-4511  4512 -4513 -1117 -4516 0

c  0+1 --> 1
c    (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧  p_1117) -> (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0)
c  in CNF:
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_2
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_1
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨  b^{1, 1118}_0
c  in DIMACS:
 4511  4512  4513 -1117 -4514 0
 4511  4512  4513 -1117 -4515 0
 4511  4512  4513 -1117  4516 0

c  1+1 --> 2
c    (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧  p_1117) -> (-b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0)
c  in CNF:
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_2
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨  b^{1, 1118}_1
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ -p_1117 ∨ -b^{1, 1118}_0
c  in DIMACS:
 4511  4512 -4513 -1117 -4514 0
 4511  4512 -4513 -1117  4515 0
 4511  4512 -4513 -1117 -4516 0

c  2+1 --> break 
c    (-b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧  p_1117) -> break
c  in CNF:
c     b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ -p_1117 ∨ break
c  in DIMACS:
 4511 -4512  4513 -1117 1162 0


c  2-1 --> 1
c    (-b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧ -p_1117) -> (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0)
c  in CNF:
c     b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_2
c     b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_1
c     b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨  b^{1, 1118}_0
c  in DIMACS:
 4511 -4512  4513  1117 -4514 0
 4511 -4512  4513  1117 -4515 0
 4511 -4512  4513  1117  4516 0

c  1-1 --> 0
c    (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧ -p_1117) -> (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧ -b^{1, 1118}_0)
c  in CNF:
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_2
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_1
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_0
c  in DIMACS:
 4511  4512 -4513  1117 -4514 0
 4511  4512 -4513  1117 -4515 0
 4511  4512 -4513  1117 -4516 0

c  0-1 --> -1
c    (-b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧ -p_1117) -> ( b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0)
c  in CNF:
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨  b^{1, 1118}_2
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_1
c     b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨  b^{1, 1118}_0
c  in DIMACS:
 4511  4512  4513  1117  4514 0
 4511  4512  4513  1117 -4515 0
 4511  4512  4513  1117  4516 0

c  -1-1 --> -2
c    ( b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧ -p_1117) -> ( b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0)
c  in CNF:
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨  b^{1, 1118}_2
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨  b^{1, 1118}_1
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨  p_1117 ∨ -b^{1, 1118}_0
c  in DIMACS:
-4511  4512 -4513  1117  4514 0
-4511  4512 -4513  1117  4515 0
-4511  4512 -4513  1117 -4516 0

c  -2-1 --> break 
c    ( b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧ -p_1117) -> break
c  in CNF:
c    -b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨  p_1117 ∨ break
c  in DIMACS:
-4511 -4512  4513  1117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1117}_2 ∧ -b^{1, 1117}_1 ∧ -b^{1, 1117}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1117}_2 ∨  b^{1, 1117}_1 ∨  b^{1, 1117}_0 ∨ false 
c  in DIMACS:
-4511  4512  4513  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧ true) 
c  in CNF:
c     b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ false 
c  in DIMACS:
 4511 -4512 -4513  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1117}_2 ∧  b^{1, 1117}_1 ∧  b^{1, 1117}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1117}_2 ∨ -b^{1, 1117}_1 ∨ -b^{1, 1117}_0 ∨ false 
c  in DIMACS:
-4511 -4512 -4513  0

c i = 1118
c  -2+1 --> -1
c    ( b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧  p_1118) -> ( b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0)
c  in CNF:
c    -b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨  b^{1, 1119}_2
c    -b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_1
c    -b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨  b^{1, 1119}_0
c  in DIMACS:
-4514 -4515  4516 -1118  4517 0
-4514 -4515  4516 -1118 -4518 0
-4514 -4515  4516 -1118  4519 0

c  -1+1 --> 0
c    ( b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧  p_1118) -> (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧ -b^{1, 1119}_0)
c  in CNF:
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_2
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_1
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_0
c  in DIMACS:
-4514  4515 -4516 -1118 -4517 0
-4514  4515 -4516 -1118 -4518 0
-4514  4515 -4516 -1118 -4519 0

c  0+1 --> 1
c    (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧  p_1118) -> (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0)
c  in CNF:
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_2
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_1
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨  b^{1, 1119}_0
c  in DIMACS:
 4514  4515  4516 -1118 -4517 0
 4514  4515  4516 -1118 -4518 0
 4514  4515  4516 -1118  4519 0

c  1+1 --> 2
c    (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧  p_1118) -> (-b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0)
c  in CNF:
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_2
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨  b^{1, 1119}_1
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ -p_1118 ∨ -b^{1, 1119}_0
c  in DIMACS:
 4514  4515 -4516 -1118 -4517 0
 4514  4515 -4516 -1118  4518 0
 4514  4515 -4516 -1118 -4519 0

c  2+1 --> break 
c    (-b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 4514 -4515  4516 -1118 1162 0


c  2-1 --> 1
c    (-b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧ -p_1118) -> (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0)
c  in CNF:
c     b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_2
c     b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_1
c     b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨  b^{1, 1119}_0
c  in DIMACS:
 4514 -4515  4516  1118 -4517 0
 4514 -4515  4516  1118 -4518 0
 4514 -4515  4516  1118  4519 0

c  1-1 --> 0
c    (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧ -p_1118) -> (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧ -b^{1, 1119}_0)
c  in CNF:
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_2
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_1
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_0
c  in DIMACS:
 4514  4515 -4516  1118 -4517 0
 4514  4515 -4516  1118 -4518 0
 4514  4515 -4516  1118 -4519 0

c  0-1 --> -1
c    (-b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧ -p_1118) -> ( b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0)
c  in CNF:
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨  b^{1, 1119}_2
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_1
c     b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨  b^{1, 1119}_0
c  in DIMACS:
 4514  4515  4516  1118  4517 0
 4514  4515  4516  1118 -4518 0
 4514  4515  4516  1118  4519 0

c  -1-1 --> -2
c    ( b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧ -p_1118) -> ( b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0)
c  in CNF:
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨  b^{1, 1119}_2
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨  b^{1, 1119}_1
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨  p_1118 ∨ -b^{1, 1119}_0
c  in DIMACS:
-4514  4515 -4516  1118  4517 0
-4514  4515 -4516  1118  4518 0
-4514  4515 -4516  1118 -4519 0

c  -2-1 --> break 
c    ( b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-4514 -4515  4516  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1118}_2 ∧ -b^{1, 1118}_1 ∧ -b^{1, 1118}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1118}_2 ∨  b^{1, 1118}_1 ∨  b^{1, 1118}_0 ∨ false 
c  in DIMACS:
-4514  4515  4516  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧ true) 
c  in CNF:
c     b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ false 
c  in DIMACS:
 4514 -4515 -4516  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1118}_2 ∧  b^{1, 1118}_1 ∧  b^{1, 1118}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1118}_2 ∨ -b^{1, 1118}_1 ∨ -b^{1, 1118}_0 ∨ false 
c  in DIMACS:
-4514 -4515 -4516  0

c i = 1119
c  -2+1 --> -1
c    ( b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧  p_1119) -> ( b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0)
c  in CNF:
c    -b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨  b^{1, 1120}_2
c    -b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_1
c    -b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨  b^{1, 1120}_0
c  in DIMACS:
-4517 -4518  4519 -1119  4520 0
-4517 -4518  4519 -1119 -4521 0
-4517 -4518  4519 -1119  4522 0

c  -1+1 --> 0
c    ( b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧  p_1119) -> (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧ -b^{1, 1120}_0)
c  in CNF:
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_2
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_1
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_0
c  in DIMACS:
-4517  4518 -4519 -1119 -4520 0
-4517  4518 -4519 -1119 -4521 0
-4517  4518 -4519 -1119 -4522 0

c  0+1 --> 1
c    (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧  p_1119) -> (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0)
c  in CNF:
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_2
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_1
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨  b^{1, 1120}_0
c  in DIMACS:
 4517  4518  4519 -1119 -4520 0
 4517  4518  4519 -1119 -4521 0
 4517  4518  4519 -1119  4522 0

c  1+1 --> 2
c    (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧  p_1119) -> (-b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0)
c  in CNF:
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_2
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨  b^{1, 1120}_1
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ -p_1119 ∨ -b^{1, 1120}_0
c  in DIMACS:
 4517  4518 -4519 -1119 -4520 0
 4517  4518 -4519 -1119  4521 0
 4517  4518 -4519 -1119 -4522 0

c  2+1 --> break 
c    (-b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧  p_1119) -> break
c  in CNF:
c     b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ -p_1119 ∨ break
c  in DIMACS:
 4517 -4518  4519 -1119 1162 0


c  2-1 --> 1
c    (-b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧ -p_1119) -> (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0)
c  in CNF:
c     b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_2
c     b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_1
c     b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨  b^{1, 1120}_0
c  in DIMACS:
 4517 -4518  4519  1119 -4520 0
 4517 -4518  4519  1119 -4521 0
 4517 -4518  4519  1119  4522 0

c  1-1 --> 0
c    (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧ -p_1119) -> (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧ -b^{1, 1120}_0)
c  in CNF:
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_2
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_1
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_0
c  in DIMACS:
 4517  4518 -4519  1119 -4520 0
 4517  4518 -4519  1119 -4521 0
 4517  4518 -4519  1119 -4522 0

c  0-1 --> -1
c    (-b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧ -p_1119) -> ( b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0)
c  in CNF:
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨  b^{1, 1120}_2
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_1
c     b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨  b^{1, 1120}_0
c  in DIMACS:
 4517  4518  4519  1119  4520 0
 4517  4518  4519  1119 -4521 0
 4517  4518  4519  1119  4522 0

c  -1-1 --> -2
c    ( b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧ -p_1119) -> ( b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0)
c  in CNF:
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨  b^{1, 1120}_2
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨  b^{1, 1120}_1
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨  p_1119 ∨ -b^{1, 1120}_0
c  in DIMACS:
-4517  4518 -4519  1119  4520 0
-4517  4518 -4519  1119  4521 0
-4517  4518 -4519  1119 -4522 0

c  -2-1 --> break 
c    ( b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧ -p_1119) -> break
c  in CNF:
c    -b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨  p_1119 ∨ break
c  in DIMACS:
-4517 -4518  4519  1119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1119}_2 ∧ -b^{1, 1119}_1 ∧ -b^{1, 1119}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1119}_2 ∨  b^{1, 1119}_1 ∨  b^{1, 1119}_0 ∨ false 
c  in DIMACS:
-4517  4518  4519  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧ true) 
c  in CNF:
c     b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ false 
c  in DIMACS:
 4517 -4518 -4519  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1119}_2 ∧  b^{1, 1119}_1 ∧  b^{1, 1119}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1119}_2 ∨ -b^{1, 1119}_1 ∨ -b^{1, 1119}_0 ∨ false 
c  in DIMACS:
-4517 -4518 -4519  0

c i = 1120
c  -2+1 --> -1
c    ( b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧  p_1120) -> ( b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0)
c  in CNF:
c    -b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨  b^{1, 1121}_2
c    -b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_1
c    -b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨  b^{1, 1121}_0
c  in DIMACS:
-4520 -4521  4522 -1120  4523 0
-4520 -4521  4522 -1120 -4524 0
-4520 -4521  4522 -1120  4525 0

c  -1+1 --> 0
c    ( b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧  p_1120) -> (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧ -b^{1, 1121}_0)
c  in CNF:
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_2
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_1
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_0
c  in DIMACS:
-4520  4521 -4522 -1120 -4523 0
-4520  4521 -4522 -1120 -4524 0
-4520  4521 -4522 -1120 -4525 0

c  0+1 --> 1
c    (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧  p_1120) -> (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0)
c  in CNF:
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_2
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_1
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨  b^{1, 1121}_0
c  in DIMACS:
 4520  4521  4522 -1120 -4523 0
 4520  4521  4522 -1120 -4524 0
 4520  4521  4522 -1120  4525 0

c  1+1 --> 2
c    (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧  p_1120) -> (-b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0)
c  in CNF:
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_2
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨  b^{1, 1121}_1
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ -p_1120 ∨ -b^{1, 1121}_0
c  in DIMACS:
 4520  4521 -4522 -1120 -4523 0
 4520  4521 -4522 -1120  4524 0
 4520  4521 -4522 -1120 -4525 0

c  2+1 --> break 
c    (-b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 4520 -4521  4522 -1120 1162 0


c  2-1 --> 1
c    (-b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧ -p_1120) -> (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0)
c  in CNF:
c     b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_2
c     b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_1
c     b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨  b^{1, 1121}_0
c  in DIMACS:
 4520 -4521  4522  1120 -4523 0
 4520 -4521  4522  1120 -4524 0
 4520 -4521  4522  1120  4525 0

c  1-1 --> 0
c    (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧ -p_1120) -> (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧ -b^{1, 1121}_0)
c  in CNF:
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_2
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_1
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_0
c  in DIMACS:
 4520  4521 -4522  1120 -4523 0
 4520  4521 -4522  1120 -4524 0
 4520  4521 -4522  1120 -4525 0

c  0-1 --> -1
c    (-b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧ -p_1120) -> ( b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0)
c  in CNF:
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨  b^{1, 1121}_2
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_1
c     b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨  b^{1, 1121}_0
c  in DIMACS:
 4520  4521  4522  1120  4523 0
 4520  4521  4522  1120 -4524 0
 4520  4521  4522  1120  4525 0

c  -1-1 --> -2
c    ( b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧ -p_1120) -> ( b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0)
c  in CNF:
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨  b^{1, 1121}_2
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨  b^{1, 1121}_1
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨  p_1120 ∨ -b^{1, 1121}_0
c  in DIMACS:
-4520  4521 -4522  1120  4523 0
-4520  4521 -4522  1120  4524 0
-4520  4521 -4522  1120 -4525 0

c  -2-1 --> break 
c    ( b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-4520 -4521  4522  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1120}_2 ∧ -b^{1, 1120}_1 ∧ -b^{1, 1120}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1120}_2 ∨  b^{1, 1120}_1 ∨  b^{1, 1120}_0 ∨ false 
c  in DIMACS:
-4520  4521  4522  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧ true) 
c  in CNF:
c     b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ false 
c  in DIMACS:
 4520 -4521 -4522  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1120}_2 ∧  b^{1, 1120}_1 ∧  b^{1, 1120}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1120}_2 ∨ -b^{1, 1120}_1 ∨ -b^{1, 1120}_0 ∨ false 
c  in DIMACS:
-4520 -4521 -4522  0

c i = 1121
c  -2+1 --> -1
c    ( b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧  p_1121) -> ( b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0)
c  in CNF:
c    -b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨  b^{1, 1122}_2
c    -b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_1
c    -b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨  b^{1, 1122}_0
c  in DIMACS:
-4523 -4524  4525 -1121  4526 0
-4523 -4524  4525 -1121 -4527 0
-4523 -4524  4525 -1121  4528 0

c  -1+1 --> 0
c    ( b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧  p_1121) -> (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧ -b^{1, 1122}_0)
c  in CNF:
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_2
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_1
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_0
c  in DIMACS:
-4523  4524 -4525 -1121 -4526 0
-4523  4524 -4525 -1121 -4527 0
-4523  4524 -4525 -1121 -4528 0

c  0+1 --> 1
c    (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧  p_1121) -> (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0)
c  in CNF:
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_2
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_1
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨  b^{1, 1122}_0
c  in DIMACS:
 4523  4524  4525 -1121 -4526 0
 4523  4524  4525 -1121 -4527 0
 4523  4524  4525 -1121  4528 0

c  1+1 --> 2
c    (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧  p_1121) -> (-b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0)
c  in CNF:
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_2
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨  b^{1, 1122}_1
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ -p_1121 ∨ -b^{1, 1122}_0
c  in DIMACS:
 4523  4524 -4525 -1121 -4526 0
 4523  4524 -4525 -1121  4527 0
 4523  4524 -4525 -1121 -4528 0

c  2+1 --> break 
c    (-b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧  p_1121) -> break
c  in CNF:
c     b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ -p_1121 ∨ break
c  in DIMACS:
 4523 -4524  4525 -1121 1162 0


c  2-1 --> 1
c    (-b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧ -p_1121) -> (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0)
c  in CNF:
c     b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_2
c     b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_1
c     b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨  b^{1, 1122}_0
c  in DIMACS:
 4523 -4524  4525  1121 -4526 0
 4523 -4524  4525  1121 -4527 0
 4523 -4524  4525  1121  4528 0

c  1-1 --> 0
c    (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧ -p_1121) -> (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧ -b^{1, 1122}_0)
c  in CNF:
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_2
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_1
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_0
c  in DIMACS:
 4523  4524 -4525  1121 -4526 0
 4523  4524 -4525  1121 -4527 0
 4523  4524 -4525  1121 -4528 0

c  0-1 --> -1
c    (-b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧ -p_1121) -> ( b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0)
c  in CNF:
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨  b^{1, 1122}_2
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_1
c     b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨  b^{1, 1122}_0
c  in DIMACS:
 4523  4524  4525  1121  4526 0
 4523  4524  4525  1121 -4527 0
 4523  4524  4525  1121  4528 0

c  -1-1 --> -2
c    ( b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧ -p_1121) -> ( b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0)
c  in CNF:
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨  b^{1, 1122}_2
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨  b^{1, 1122}_1
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨  p_1121 ∨ -b^{1, 1122}_0
c  in DIMACS:
-4523  4524 -4525  1121  4526 0
-4523  4524 -4525  1121  4527 0
-4523  4524 -4525  1121 -4528 0

c  -2-1 --> break 
c    ( b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧ -p_1121) -> break
c  in CNF:
c    -b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨  p_1121 ∨ break
c  in DIMACS:
-4523 -4524  4525  1121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1121}_2 ∧ -b^{1, 1121}_1 ∧ -b^{1, 1121}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1121}_2 ∨  b^{1, 1121}_1 ∨  b^{1, 1121}_0 ∨ false 
c  in DIMACS:
-4523  4524  4525  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧ true) 
c  in CNF:
c     b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ false 
c  in DIMACS:
 4523 -4524 -4525  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1121}_2 ∧  b^{1, 1121}_1 ∧  b^{1, 1121}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1121}_2 ∨ -b^{1, 1121}_1 ∨ -b^{1, 1121}_0 ∨ false 
c  in DIMACS:
-4523 -4524 -4525  0

c i = 1122
c  -2+1 --> -1
c    ( b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧  p_1122) -> ( b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0)
c  in CNF:
c    -b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨  b^{1, 1123}_2
c    -b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_1
c    -b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨  b^{1, 1123}_0
c  in DIMACS:
-4526 -4527  4528 -1122  4529 0
-4526 -4527  4528 -1122 -4530 0
-4526 -4527  4528 -1122  4531 0

c  -1+1 --> 0
c    ( b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧  p_1122) -> (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧ -b^{1, 1123}_0)
c  in CNF:
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_2
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_1
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_0
c  in DIMACS:
-4526  4527 -4528 -1122 -4529 0
-4526  4527 -4528 -1122 -4530 0
-4526  4527 -4528 -1122 -4531 0

c  0+1 --> 1
c    (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧  p_1122) -> (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0)
c  in CNF:
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_2
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_1
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨  b^{1, 1123}_0
c  in DIMACS:
 4526  4527  4528 -1122 -4529 0
 4526  4527  4528 -1122 -4530 0
 4526  4527  4528 -1122  4531 0

c  1+1 --> 2
c    (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧  p_1122) -> (-b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0)
c  in CNF:
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_2
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨  b^{1, 1123}_1
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ -p_1122 ∨ -b^{1, 1123}_0
c  in DIMACS:
 4526  4527 -4528 -1122 -4529 0
 4526  4527 -4528 -1122  4530 0
 4526  4527 -4528 -1122 -4531 0

c  2+1 --> break 
c    (-b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 4526 -4527  4528 -1122 1162 0


c  2-1 --> 1
c    (-b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧ -p_1122) -> (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0)
c  in CNF:
c     b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_2
c     b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_1
c     b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨  b^{1, 1123}_0
c  in DIMACS:
 4526 -4527  4528  1122 -4529 0
 4526 -4527  4528  1122 -4530 0
 4526 -4527  4528  1122  4531 0

c  1-1 --> 0
c    (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧ -p_1122) -> (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧ -b^{1, 1123}_0)
c  in CNF:
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_2
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_1
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_0
c  in DIMACS:
 4526  4527 -4528  1122 -4529 0
 4526  4527 -4528  1122 -4530 0
 4526  4527 -4528  1122 -4531 0

c  0-1 --> -1
c    (-b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧ -p_1122) -> ( b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0)
c  in CNF:
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨  b^{1, 1123}_2
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_1
c     b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨  b^{1, 1123}_0
c  in DIMACS:
 4526  4527  4528  1122  4529 0
 4526  4527  4528  1122 -4530 0
 4526  4527  4528  1122  4531 0

c  -1-1 --> -2
c    ( b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧ -p_1122) -> ( b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0)
c  in CNF:
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨  b^{1, 1123}_2
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨  b^{1, 1123}_1
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨  p_1122 ∨ -b^{1, 1123}_0
c  in DIMACS:
-4526  4527 -4528  1122  4529 0
-4526  4527 -4528  1122  4530 0
-4526  4527 -4528  1122 -4531 0

c  -2-1 --> break 
c    ( b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-4526 -4527  4528  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1122}_2 ∧ -b^{1, 1122}_1 ∧ -b^{1, 1122}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1122}_2 ∨  b^{1, 1122}_1 ∨  b^{1, 1122}_0 ∨ false 
c  in DIMACS:
-4526  4527  4528  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧ true) 
c  in CNF:
c     b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ false 
c  in DIMACS:
 4526 -4527 -4528  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1122}_2 ∧  b^{1, 1122}_1 ∧  b^{1, 1122}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1122}_2 ∨ -b^{1, 1122}_1 ∨ -b^{1, 1122}_0 ∨ false 
c  in DIMACS:
-4526 -4527 -4528  0

c i = 1123
c  -2+1 --> -1
c    ( b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧  p_1123) -> ( b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0)
c  in CNF:
c    -b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨  b^{1, 1124}_2
c    -b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_1
c    -b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨  b^{1, 1124}_0
c  in DIMACS:
-4529 -4530  4531 -1123  4532 0
-4529 -4530  4531 -1123 -4533 0
-4529 -4530  4531 -1123  4534 0

c  -1+1 --> 0
c    ( b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧  p_1123) -> (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧ -b^{1, 1124}_0)
c  in CNF:
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_2
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_1
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_0
c  in DIMACS:
-4529  4530 -4531 -1123 -4532 0
-4529  4530 -4531 -1123 -4533 0
-4529  4530 -4531 -1123 -4534 0

c  0+1 --> 1
c    (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧  p_1123) -> (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0)
c  in CNF:
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_2
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_1
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨  b^{1, 1124}_0
c  in DIMACS:
 4529  4530  4531 -1123 -4532 0
 4529  4530  4531 -1123 -4533 0
 4529  4530  4531 -1123  4534 0

c  1+1 --> 2
c    (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧  p_1123) -> (-b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0)
c  in CNF:
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_2
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨  b^{1, 1124}_1
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ -p_1123 ∨ -b^{1, 1124}_0
c  in DIMACS:
 4529  4530 -4531 -1123 -4532 0
 4529  4530 -4531 -1123  4533 0
 4529  4530 -4531 -1123 -4534 0

c  2+1 --> break 
c    (-b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧  p_1123) -> break
c  in CNF:
c     b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ -p_1123 ∨ break
c  in DIMACS:
 4529 -4530  4531 -1123 1162 0


c  2-1 --> 1
c    (-b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧ -p_1123) -> (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0)
c  in CNF:
c     b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_2
c     b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_1
c     b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨  b^{1, 1124}_0
c  in DIMACS:
 4529 -4530  4531  1123 -4532 0
 4529 -4530  4531  1123 -4533 0
 4529 -4530  4531  1123  4534 0

c  1-1 --> 0
c    (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧ -p_1123) -> (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧ -b^{1, 1124}_0)
c  in CNF:
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_2
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_1
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_0
c  in DIMACS:
 4529  4530 -4531  1123 -4532 0
 4529  4530 -4531  1123 -4533 0
 4529  4530 -4531  1123 -4534 0

c  0-1 --> -1
c    (-b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧ -p_1123) -> ( b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0)
c  in CNF:
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨  b^{1, 1124}_2
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_1
c     b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨  b^{1, 1124}_0
c  in DIMACS:
 4529  4530  4531  1123  4532 0
 4529  4530  4531  1123 -4533 0
 4529  4530  4531  1123  4534 0

c  -1-1 --> -2
c    ( b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧ -p_1123) -> ( b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0)
c  in CNF:
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨  b^{1, 1124}_2
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨  b^{1, 1124}_1
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨  p_1123 ∨ -b^{1, 1124}_0
c  in DIMACS:
-4529  4530 -4531  1123  4532 0
-4529  4530 -4531  1123  4533 0
-4529  4530 -4531  1123 -4534 0

c  -2-1 --> break 
c    ( b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧ -p_1123) -> break
c  in CNF:
c    -b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨  p_1123 ∨ break
c  in DIMACS:
-4529 -4530  4531  1123 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1123}_2 ∧ -b^{1, 1123}_1 ∧ -b^{1, 1123}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1123}_2 ∨  b^{1, 1123}_1 ∨  b^{1, 1123}_0 ∨ false 
c  in DIMACS:
-4529  4530  4531  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧ true) 
c  in CNF:
c     b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ false 
c  in DIMACS:
 4529 -4530 -4531  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1123}_2 ∧  b^{1, 1123}_1 ∧  b^{1, 1123}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1123}_2 ∨ -b^{1, 1123}_1 ∨ -b^{1, 1123}_0 ∨ false 
c  in DIMACS:
-4529 -4530 -4531  0

c i = 1124
c  -2+1 --> -1
c    ( b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧  p_1124) -> ( b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0)
c  in CNF:
c    -b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨  b^{1, 1125}_2
c    -b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_1
c    -b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨  b^{1, 1125}_0
c  in DIMACS:
-4532 -4533  4534 -1124  4535 0
-4532 -4533  4534 -1124 -4536 0
-4532 -4533  4534 -1124  4537 0

c  -1+1 --> 0
c    ( b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧  p_1124) -> (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧ -b^{1, 1125}_0)
c  in CNF:
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_2
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_1
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_0
c  in DIMACS:
-4532  4533 -4534 -1124 -4535 0
-4532  4533 -4534 -1124 -4536 0
-4532  4533 -4534 -1124 -4537 0

c  0+1 --> 1
c    (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧  p_1124) -> (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0)
c  in CNF:
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_2
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_1
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨  b^{1, 1125}_0
c  in DIMACS:
 4532  4533  4534 -1124 -4535 0
 4532  4533  4534 -1124 -4536 0
 4532  4533  4534 -1124  4537 0

c  1+1 --> 2
c    (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧  p_1124) -> (-b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0)
c  in CNF:
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_2
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨  b^{1, 1125}_1
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ -p_1124 ∨ -b^{1, 1125}_0
c  in DIMACS:
 4532  4533 -4534 -1124 -4535 0
 4532  4533 -4534 -1124  4536 0
 4532  4533 -4534 -1124 -4537 0

c  2+1 --> break 
c    (-b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧  p_1124) -> break
c  in CNF:
c     b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ -p_1124 ∨ break
c  in DIMACS:
 4532 -4533  4534 -1124 1162 0


c  2-1 --> 1
c    (-b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧ -p_1124) -> (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0)
c  in CNF:
c     b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_2
c     b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_1
c     b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨  b^{1, 1125}_0
c  in DIMACS:
 4532 -4533  4534  1124 -4535 0
 4532 -4533  4534  1124 -4536 0
 4532 -4533  4534  1124  4537 0

c  1-1 --> 0
c    (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧ -p_1124) -> (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧ -b^{1, 1125}_0)
c  in CNF:
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_2
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_1
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_0
c  in DIMACS:
 4532  4533 -4534  1124 -4535 0
 4532  4533 -4534  1124 -4536 0
 4532  4533 -4534  1124 -4537 0

c  0-1 --> -1
c    (-b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧ -p_1124) -> ( b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0)
c  in CNF:
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨  b^{1, 1125}_2
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_1
c     b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨  b^{1, 1125}_0
c  in DIMACS:
 4532  4533  4534  1124  4535 0
 4532  4533  4534  1124 -4536 0
 4532  4533  4534  1124  4537 0

c  -1-1 --> -2
c    ( b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧ -p_1124) -> ( b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0)
c  in CNF:
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨  b^{1, 1125}_2
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨  b^{1, 1125}_1
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨  p_1124 ∨ -b^{1, 1125}_0
c  in DIMACS:
-4532  4533 -4534  1124  4535 0
-4532  4533 -4534  1124  4536 0
-4532  4533 -4534  1124 -4537 0

c  -2-1 --> break 
c    ( b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧ -p_1124) -> break
c  in CNF:
c    -b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨  p_1124 ∨ break
c  in DIMACS:
-4532 -4533  4534  1124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1124}_2 ∧ -b^{1, 1124}_1 ∧ -b^{1, 1124}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1124}_2 ∨  b^{1, 1124}_1 ∨  b^{1, 1124}_0 ∨ false 
c  in DIMACS:
-4532  4533  4534  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧ true) 
c  in CNF:
c     b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ false 
c  in DIMACS:
 4532 -4533 -4534  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1124}_2 ∧  b^{1, 1124}_1 ∧  b^{1, 1124}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1124}_2 ∨ -b^{1, 1124}_1 ∨ -b^{1, 1124}_0 ∨ false 
c  in DIMACS:
-4532 -4533 -4534  0

c i = 1125
c  -2+1 --> -1
c    ( b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧  p_1125) -> ( b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0)
c  in CNF:
c    -b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨  b^{1, 1126}_2
c    -b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_1
c    -b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨  b^{1, 1126}_0
c  in DIMACS:
-4535 -4536  4537 -1125  4538 0
-4535 -4536  4537 -1125 -4539 0
-4535 -4536  4537 -1125  4540 0

c  -1+1 --> 0
c    ( b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧  p_1125) -> (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧ -b^{1, 1126}_0)
c  in CNF:
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_2
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_1
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_0
c  in DIMACS:
-4535  4536 -4537 -1125 -4538 0
-4535  4536 -4537 -1125 -4539 0
-4535  4536 -4537 -1125 -4540 0

c  0+1 --> 1
c    (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧  p_1125) -> (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0)
c  in CNF:
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_2
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_1
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨  b^{1, 1126}_0
c  in DIMACS:
 4535  4536  4537 -1125 -4538 0
 4535  4536  4537 -1125 -4539 0
 4535  4536  4537 -1125  4540 0

c  1+1 --> 2
c    (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧  p_1125) -> (-b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0)
c  in CNF:
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_2
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨  b^{1, 1126}_1
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ -p_1125 ∨ -b^{1, 1126}_0
c  in DIMACS:
 4535  4536 -4537 -1125 -4538 0
 4535  4536 -4537 -1125  4539 0
 4535  4536 -4537 -1125 -4540 0

c  2+1 --> break 
c    (-b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 4535 -4536  4537 -1125 1162 0


c  2-1 --> 1
c    (-b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧ -p_1125) -> (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0)
c  in CNF:
c     b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_2
c     b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_1
c     b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨  b^{1, 1126}_0
c  in DIMACS:
 4535 -4536  4537  1125 -4538 0
 4535 -4536  4537  1125 -4539 0
 4535 -4536  4537  1125  4540 0

c  1-1 --> 0
c    (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧ -p_1125) -> (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧ -b^{1, 1126}_0)
c  in CNF:
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_2
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_1
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_0
c  in DIMACS:
 4535  4536 -4537  1125 -4538 0
 4535  4536 -4537  1125 -4539 0
 4535  4536 -4537  1125 -4540 0

c  0-1 --> -1
c    (-b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧ -p_1125) -> ( b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0)
c  in CNF:
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨  b^{1, 1126}_2
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_1
c     b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨  b^{1, 1126}_0
c  in DIMACS:
 4535  4536  4537  1125  4538 0
 4535  4536  4537  1125 -4539 0
 4535  4536  4537  1125  4540 0

c  -1-1 --> -2
c    ( b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧ -p_1125) -> ( b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0)
c  in CNF:
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨  b^{1, 1126}_2
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨  b^{1, 1126}_1
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨  p_1125 ∨ -b^{1, 1126}_0
c  in DIMACS:
-4535  4536 -4537  1125  4538 0
-4535  4536 -4537  1125  4539 0
-4535  4536 -4537  1125 -4540 0

c  -2-1 --> break 
c    ( b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-4535 -4536  4537  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1125}_2 ∧ -b^{1, 1125}_1 ∧ -b^{1, 1125}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1125}_2 ∨  b^{1, 1125}_1 ∨  b^{1, 1125}_0 ∨ false 
c  in DIMACS:
-4535  4536  4537  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧ true) 
c  in CNF:
c     b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ false 
c  in DIMACS:
 4535 -4536 -4537  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1125}_2 ∧  b^{1, 1125}_1 ∧  b^{1, 1125}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1125}_2 ∨ -b^{1, 1125}_1 ∨ -b^{1, 1125}_0 ∨ false 
c  in DIMACS:
-4535 -4536 -4537  0

c i = 1126
c  -2+1 --> -1
c    ( b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧  p_1126) -> ( b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0)
c  in CNF:
c    -b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨  b^{1, 1127}_2
c    -b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_1
c    -b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨  b^{1, 1127}_0
c  in DIMACS:
-4538 -4539  4540 -1126  4541 0
-4538 -4539  4540 -1126 -4542 0
-4538 -4539  4540 -1126  4543 0

c  -1+1 --> 0
c    ( b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧  p_1126) -> (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧ -b^{1, 1127}_0)
c  in CNF:
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_2
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_1
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_0
c  in DIMACS:
-4538  4539 -4540 -1126 -4541 0
-4538  4539 -4540 -1126 -4542 0
-4538  4539 -4540 -1126 -4543 0

c  0+1 --> 1
c    (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧  p_1126) -> (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0)
c  in CNF:
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_2
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_1
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨  b^{1, 1127}_0
c  in DIMACS:
 4538  4539  4540 -1126 -4541 0
 4538  4539  4540 -1126 -4542 0
 4538  4539  4540 -1126  4543 0

c  1+1 --> 2
c    (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧  p_1126) -> (-b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0)
c  in CNF:
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_2
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨  b^{1, 1127}_1
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ -p_1126 ∨ -b^{1, 1127}_0
c  in DIMACS:
 4538  4539 -4540 -1126 -4541 0
 4538  4539 -4540 -1126  4542 0
 4538  4539 -4540 -1126 -4543 0

c  2+1 --> break 
c    (-b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧  p_1126) -> break
c  in CNF:
c     b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ -p_1126 ∨ break
c  in DIMACS:
 4538 -4539  4540 -1126 1162 0


c  2-1 --> 1
c    (-b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧ -p_1126) -> (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0)
c  in CNF:
c     b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_2
c     b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_1
c     b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨  b^{1, 1127}_0
c  in DIMACS:
 4538 -4539  4540  1126 -4541 0
 4538 -4539  4540  1126 -4542 0
 4538 -4539  4540  1126  4543 0

c  1-1 --> 0
c    (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧ -p_1126) -> (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧ -b^{1, 1127}_0)
c  in CNF:
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_2
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_1
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_0
c  in DIMACS:
 4538  4539 -4540  1126 -4541 0
 4538  4539 -4540  1126 -4542 0
 4538  4539 -4540  1126 -4543 0

c  0-1 --> -1
c    (-b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧ -p_1126) -> ( b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0)
c  in CNF:
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨  b^{1, 1127}_2
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_1
c     b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨  b^{1, 1127}_0
c  in DIMACS:
 4538  4539  4540  1126  4541 0
 4538  4539  4540  1126 -4542 0
 4538  4539  4540  1126  4543 0

c  -1-1 --> -2
c    ( b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧ -p_1126) -> ( b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0)
c  in CNF:
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨  b^{1, 1127}_2
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨  b^{1, 1127}_1
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨  p_1126 ∨ -b^{1, 1127}_0
c  in DIMACS:
-4538  4539 -4540  1126  4541 0
-4538  4539 -4540  1126  4542 0
-4538  4539 -4540  1126 -4543 0

c  -2-1 --> break 
c    ( b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧ -p_1126) -> break
c  in CNF:
c    -b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨  p_1126 ∨ break
c  in DIMACS:
-4538 -4539  4540  1126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1126}_2 ∧ -b^{1, 1126}_1 ∧ -b^{1, 1126}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1126}_2 ∨  b^{1, 1126}_1 ∨  b^{1, 1126}_0 ∨ false 
c  in DIMACS:
-4538  4539  4540  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧ true) 
c  in CNF:
c     b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ false 
c  in DIMACS:
 4538 -4539 -4540  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1126}_2 ∧  b^{1, 1126}_1 ∧  b^{1, 1126}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1126}_2 ∨ -b^{1, 1126}_1 ∨ -b^{1, 1126}_0 ∨ false 
c  in DIMACS:
-4538 -4539 -4540  0

c i = 1127
c  -2+1 --> -1
c    ( b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧  p_1127) -> ( b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0)
c  in CNF:
c    -b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨  b^{1, 1128}_2
c    -b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_1
c    -b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨  b^{1, 1128}_0
c  in DIMACS:
-4541 -4542  4543 -1127  4544 0
-4541 -4542  4543 -1127 -4545 0
-4541 -4542  4543 -1127  4546 0

c  -1+1 --> 0
c    ( b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧  p_1127) -> (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧ -b^{1, 1128}_0)
c  in CNF:
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_2
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_1
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_0
c  in DIMACS:
-4541  4542 -4543 -1127 -4544 0
-4541  4542 -4543 -1127 -4545 0
-4541  4542 -4543 -1127 -4546 0

c  0+1 --> 1
c    (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧  p_1127) -> (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0)
c  in CNF:
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_2
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_1
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨  b^{1, 1128}_0
c  in DIMACS:
 4541  4542  4543 -1127 -4544 0
 4541  4542  4543 -1127 -4545 0
 4541  4542  4543 -1127  4546 0

c  1+1 --> 2
c    (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧  p_1127) -> (-b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0)
c  in CNF:
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_2
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨  b^{1, 1128}_1
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ -p_1127 ∨ -b^{1, 1128}_0
c  in DIMACS:
 4541  4542 -4543 -1127 -4544 0
 4541  4542 -4543 -1127  4545 0
 4541  4542 -4543 -1127 -4546 0

c  2+1 --> break 
c    (-b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧  p_1127) -> break
c  in CNF:
c     b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ -p_1127 ∨ break
c  in DIMACS:
 4541 -4542  4543 -1127 1162 0


c  2-1 --> 1
c    (-b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧ -p_1127) -> (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0)
c  in CNF:
c     b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_2
c     b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_1
c     b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨  b^{1, 1128}_0
c  in DIMACS:
 4541 -4542  4543  1127 -4544 0
 4541 -4542  4543  1127 -4545 0
 4541 -4542  4543  1127  4546 0

c  1-1 --> 0
c    (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧ -p_1127) -> (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧ -b^{1, 1128}_0)
c  in CNF:
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_2
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_1
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_0
c  in DIMACS:
 4541  4542 -4543  1127 -4544 0
 4541  4542 -4543  1127 -4545 0
 4541  4542 -4543  1127 -4546 0

c  0-1 --> -1
c    (-b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧ -p_1127) -> ( b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0)
c  in CNF:
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨  b^{1, 1128}_2
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_1
c     b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨  b^{1, 1128}_0
c  in DIMACS:
 4541  4542  4543  1127  4544 0
 4541  4542  4543  1127 -4545 0
 4541  4542  4543  1127  4546 0

c  -1-1 --> -2
c    ( b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧ -p_1127) -> ( b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0)
c  in CNF:
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨  b^{1, 1128}_2
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨  b^{1, 1128}_1
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨  p_1127 ∨ -b^{1, 1128}_0
c  in DIMACS:
-4541  4542 -4543  1127  4544 0
-4541  4542 -4543  1127  4545 0
-4541  4542 -4543  1127 -4546 0

c  -2-1 --> break 
c    ( b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧ -p_1127) -> break
c  in CNF:
c    -b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨  p_1127 ∨ break
c  in DIMACS:
-4541 -4542  4543  1127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1127}_2 ∧ -b^{1, 1127}_1 ∧ -b^{1, 1127}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1127}_2 ∨  b^{1, 1127}_1 ∨  b^{1, 1127}_0 ∨ false 
c  in DIMACS:
-4541  4542  4543  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧ true) 
c  in CNF:
c     b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ false 
c  in DIMACS:
 4541 -4542 -4543  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1127}_2 ∧  b^{1, 1127}_1 ∧  b^{1, 1127}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1127}_2 ∨ -b^{1, 1127}_1 ∨ -b^{1, 1127}_0 ∨ false 
c  in DIMACS:
-4541 -4542 -4543  0

c i = 1128
c  -2+1 --> -1
c    ( b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧  p_1128) -> ( b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0)
c  in CNF:
c    -b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨  b^{1, 1129}_2
c    -b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_1
c    -b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨  b^{1, 1129}_0
c  in DIMACS:
-4544 -4545  4546 -1128  4547 0
-4544 -4545  4546 -1128 -4548 0
-4544 -4545  4546 -1128  4549 0

c  -1+1 --> 0
c    ( b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧  p_1128) -> (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧ -b^{1, 1129}_0)
c  in CNF:
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_2
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_1
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_0
c  in DIMACS:
-4544  4545 -4546 -1128 -4547 0
-4544  4545 -4546 -1128 -4548 0
-4544  4545 -4546 -1128 -4549 0

c  0+1 --> 1
c    (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧  p_1128) -> (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0)
c  in CNF:
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_2
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_1
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨  b^{1, 1129}_0
c  in DIMACS:
 4544  4545  4546 -1128 -4547 0
 4544  4545  4546 -1128 -4548 0
 4544  4545  4546 -1128  4549 0

c  1+1 --> 2
c    (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧  p_1128) -> (-b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0)
c  in CNF:
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_2
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨  b^{1, 1129}_1
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ -p_1128 ∨ -b^{1, 1129}_0
c  in DIMACS:
 4544  4545 -4546 -1128 -4547 0
 4544  4545 -4546 -1128  4548 0
 4544  4545 -4546 -1128 -4549 0

c  2+1 --> break 
c    (-b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 4544 -4545  4546 -1128 1162 0


c  2-1 --> 1
c    (-b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧ -p_1128) -> (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0)
c  in CNF:
c     b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_2
c     b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_1
c     b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨  b^{1, 1129}_0
c  in DIMACS:
 4544 -4545  4546  1128 -4547 0
 4544 -4545  4546  1128 -4548 0
 4544 -4545  4546  1128  4549 0

c  1-1 --> 0
c    (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧ -p_1128) -> (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧ -b^{1, 1129}_0)
c  in CNF:
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_2
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_1
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_0
c  in DIMACS:
 4544  4545 -4546  1128 -4547 0
 4544  4545 -4546  1128 -4548 0
 4544  4545 -4546  1128 -4549 0

c  0-1 --> -1
c    (-b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧ -p_1128) -> ( b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0)
c  in CNF:
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨  b^{1, 1129}_2
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_1
c     b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨  b^{1, 1129}_0
c  in DIMACS:
 4544  4545  4546  1128  4547 0
 4544  4545  4546  1128 -4548 0
 4544  4545  4546  1128  4549 0

c  -1-1 --> -2
c    ( b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧ -p_1128) -> ( b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0)
c  in CNF:
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨  b^{1, 1129}_2
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨  b^{1, 1129}_1
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨  p_1128 ∨ -b^{1, 1129}_0
c  in DIMACS:
-4544  4545 -4546  1128  4547 0
-4544  4545 -4546  1128  4548 0
-4544  4545 -4546  1128 -4549 0

c  -2-1 --> break 
c    ( b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-4544 -4545  4546  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1128}_2 ∧ -b^{1, 1128}_1 ∧ -b^{1, 1128}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1128}_2 ∨  b^{1, 1128}_1 ∨  b^{1, 1128}_0 ∨ false 
c  in DIMACS:
-4544  4545  4546  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧ true) 
c  in CNF:
c     b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ false 
c  in DIMACS:
 4544 -4545 -4546  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1128}_2 ∧  b^{1, 1128}_1 ∧  b^{1, 1128}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1128}_2 ∨ -b^{1, 1128}_1 ∨ -b^{1, 1128}_0 ∨ false 
c  in DIMACS:
-4544 -4545 -4546  0

c i = 1129
c  -2+1 --> -1
c    ( b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧  p_1129) -> ( b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0)
c  in CNF:
c    -b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨  b^{1, 1130}_2
c    -b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_1
c    -b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨  b^{1, 1130}_0
c  in DIMACS:
-4547 -4548  4549 -1129  4550 0
-4547 -4548  4549 -1129 -4551 0
-4547 -4548  4549 -1129  4552 0

c  -1+1 --> 0
c    ( b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧  p_1129) -> (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧ -b^{1, 1130}_0)
c  in CNF:
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_2
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_1
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_0
c  in DIMACS:
-4547  4548 -4549 -1129 -4550 0
-4547  4548 -4549 -1129 -4551 0
-4547  4548 -4549 -1129 -4552 0

c  0+1 --> 1
c    (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧  p_1129) -> (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0)
c  in CNF:
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_2
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_1
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨  b^{1, 1130}_0
c  in DIMACS:
 4547  4548  4549 -1129 -4550 0
 4547  4548  4549 -1129 -4551 0
 4547  4548  4549 -1129  4552 0

c  1+1 --> 2
c    (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧  p_1129) -> (-b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0)
c  in CNF:
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_2
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨  b^{1, 1130}_1
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ -p_1129 ∨ -b^{1, 1130}_0
c  in DIMACS:
 4547  4548 -4549 -1129 -4550 0
 4547  4548 -4549 -1129  4551 0
 4547  4548 -4549 -1129 -4552 0

c  2+1 --> break 
c    (-b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧  p_1129) -> break
c  in CNF:
c     b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ -p_1129 ∨ break
c  in DIMACS:
 4547 -4548  4549 -1129 1162 0


c  2-1 --> 1
c    (-b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧ -p_1129) -> (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0)
c  in CNF:
c     b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_2
c     b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_1
c     b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨  b^{1, 1130}_0
c  in DIMACS:
 4547 -4548  4549  1129 -4550 0
 4547 -4548  4549  1129 -4551 0
 4547 -4548  4549  1129  4552 0

c  1-1 --> 0
c    (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧ -p_1129) -> (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧ -b^{1, 1130}_0)
c  in CNF:
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_2
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_1
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_0
c  in DIMACS:
 4547  4548 -4549  1129 -4550 0
 4547  4548 -4549  1129 -4551 0
 4547  4548 -4549  1129 -4552 0

c  0-1 --> -1
c    (-b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧ -p_1129) -> ( b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0)
c  in CNF:
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨  b^{1, 1130}_2
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_1
c     b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨  b^{1, 1130}_0
c  in DIMACS:
 4547  4548  4549  1129  4550 0
 4547  4548  4549  1129 -4551 0
 4547  4548  4549  1129  4552 0

c  -1-1 --> -2
c    ( b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧ -p_1129) -> ( b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0)
c  in CNF:
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨  b^{1, 1130}_2
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨  b^{1, 1130}_1
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨  p_1129 ∨ -b^{1, 1130}_0
c  in DIMACS:
-4547  4548 -4549  1129  4550 0
-4547  4548 -4549  1129  4551 0
-4547  4548 -4549  1129 -4552 0

c  -2-1 --> break 
c    ( b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧ -p_1129) -> break
c  in CNF:
c    -b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨  p_1129 ∨ break
c  in DIMACS:
-4547 -4548  4549  1129 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1129}_2 ∧ -b^{1, 1129}_1 ∧ -b^{1, 1129}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1129}_2 ∨  b^{1, 1129}_1 ∨  b^{1, 1129}_0 ∨ false 
c  in DIMACS:
-4547  4548  4549  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧ true) 
c  in CNF:
c     b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ false 
c  in DIMACS:
 4547 -4548 -4549  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1129}_2 ∧  b^{1, 1129}_1 ∧  b^{1, 1129}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1129}_2 ∨ -b^{1, 1129}_1 ∨ -b^{1, 1129}_0 ∨ false 
c  in DIMACS:
-4547 -4548 -4549  0

c i = 1130
c  -2+1 --> -1
c    ( b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧  p_1130) -> ( b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0)
c  in CNF:
c    -b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨  b^{1, 1131}_2
c    -b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_1
c    -b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨  b^{1, 1131}_0
c  in DIMACS:
-4550 -4551  4552 -1130  4553 0
-4550 -4551  4552 -1130 -4554 0
-4550 -4551  4552 -1130  4555 0

c  -1+1 --> 0
c    ( b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧  p_1130) -> (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧ -b^{1, 1131}_0)
c  in CNF:
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_2
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_1
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_0
c  in DIMACS:
-4550  4551 -4552 -1130 -4553 0
-4550  4551 -4552 -1130 -4554 0
-4550  4551 -4552 -1130 -4555 0

c  0+1 --> 1
c    (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧  p_1130) -> (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0)
c  in CNF:
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_2
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_1
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨  b^{1, 1131}_0
c  in DIMACS:
 4550  4551  4552 -1130 -4553 0
 4550  4551  4552 -1130 -4554 0
 4550  4551  4552 -1130  4555 0

c  1+1 --> 2
c    (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧  p_1130) -> (-b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0)
c  in CNF:
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_2
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨  b^{1, 1131}_1
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ -p_1130 ∨ -b^{1, 1131}_0
c  in DIMACS:
 4550  4551 -4552 -1130 -4553 0
 4550  4551 -4552 -1130  4554 0
 4550  4551 -4552 -1130 -4555 0

c  2+1 --> break 
c    (-b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 4550 -4551  4552 -1130 1162 0


c  2-1 --> 1
c    (-b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧ -p_1130) -> (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0)
c  in CNF:
c     b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_2
c     b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_1
c     b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨  b^{1, 1131}_0
c  in DIMACS:
 4550 -4551  4552  1130 -4553 0
 4550 -4551  4552  1130 -4554 0
 4550 -4551  4552  1130  4555 0

c  1-1 --> 0
c    (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧ -p_1130) -> (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧ -b^{1, 1131}_0)
c  in CNF:
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_2
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_1
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_0
c  in DIMACS:
 4550  4551 -4552  1130 -4553 0
 4550  4551 -4552  1130 -4554 0
 4550  4551 -4552  1130 -4555 0

c  0-1 --> -1
c    (-b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧ -p_1130) -> ( b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0)
c  in CNF:
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨  b^{1, 1131}_2
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_1
c     b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨  b^{1, 1131}_0
c  in DIMACS:
 4550  4551  4552  1130  4553 0
 4550  4551  4552  1130 -4554 0
 4550  4551  4552  1130  4555 0

c  -1-1 --> -2
c    ( b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧ -p_1130) -> ( b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0)
c  in CNF:
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨  b^{1, 1131}_2
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨  b^{1, 1131}_1
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨  p_1130 ∨ -b^{1, 1131}_0
c  in DIMACS:
-4550  4551 -4552  1130  4553 0
-4550  4551 -4552  1130  4554 0
-4550  4551 -4552  1130 -4555 0

c  -2-1 --> break 
c    ( b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-4550 -4551  4552  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1130}_2 ∧ -b^{1, 1130}_1 ∧ -b^{1, 1130}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1130}_2 ∨  b^{1, 1130}_1 ∨  b^{1, 1130}_0 ∨ false 
c  in DIMACS:
-4550  4551  4552  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧ true) 
c  in CNF:
c     b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ false 
c  in DIMACS:
 4550 -4551 -4552  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1130}_2 ∧  b^{1, 1130}_1 ∧  b^{1, 1130}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1130}_2 ∨ -b^{1, 1130}_1 ∨ -b^{1, 1130}_0 ∨ false 
c  in DIMACS:
-4550 -4551 -4552  0

c i = 1131
c  -2+1 --> -1
c    ( b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧  p_1131) -> ( b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0)
c  in CNF:
c    -b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨  b^{1, 1132}_2
c    -b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_1
c    -b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨  b^{1, 1132}_0
c  in DIMACS:
-4553 -4554  4555 -1131  4556 0
-4553 -4554  4555 -1131 -4557 0
-4553 -4554  4555 -1131  4558 0

c  -1+1 --> 0
c    ( b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧  p_1131) -> (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧ -b^{1, 1132}_0)
c  in CNF:
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_2
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_1
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_0
c  in DIMACS:
-4553  4554 -4555 -1131 -4556 0
-4553  4554 -4555 -1131 -4557 0
-4553  4554 -4555 -1131 -4558 0

c  0+1 --> 1
c    (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧  p_1131) -> (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0)
c  in CNF:
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_2
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_1
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨  b^{1, 1132}_0
c  in DIMACS:
 4553  4554  4555 -1131 -4556 0
 4553  4554  4555 -1131 -4557 0
 4553  4554  4555 -1131  4558 0

c  1+1 --> 2
c    (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧  p_1131) -> (-b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0)
c  in CNF:
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_2
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨  b^{1, 1132}_1
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ -p_1131 ∨ -b^{1, 1132}_0
c  in DIMACS:
 4553  4554 -4555 -1131 -4556 0
 4553  4554 -4555 -1131  4557 0
 4553  4554 -4555 -1131 -4558 0

c  2+1 --> break 
c    (-b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 4553 -4554  4555 -1131 1162 0


c  2-1 --> 1
c    (-b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧ -p_1131) -> (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0)
c  in CNF:
c     b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_2
c     b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_1
c     b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨  b^{1, 1132}_0
c  in DIMACS:
 4553 -4554  4555  1131 -4556 0
 4553 -4554  4555  1131 -4557 0
 4553 -4554  4555  1131  4558 0

c  1-1 --> 0
c    (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧ -p_1131) -> (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧ -b^{1, 1132}_0)
c  in CNF:
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_2
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_1
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_0
c  in DIMACS:
 4553  4554 -4555  1131 -4556 0
 4553  4554 -4555  1131 -4557 0
 4553  4554 -4555  1131 -4558 0

c  0-1 --> -1
c    (-b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧ -p_1131) -> ( b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0)
c  in CNF:
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨  b^{1, 1132}_2
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_1
c     b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨  b^{1, 1132}_0
c  in DIMACS:
 4553  4554  4555  1131  4556 0
 4553  4554  4555  1131 -4557 0
 4553  4554  4555  1131  4558 0

c  -1-1 --> -2
c    ( b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧ -p_1131) -> ( b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0)
c  in CNF:
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨  b^{1, 1132}_2
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨  b^{1, 1132}_1
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨  p_1131 ∨ -b^{1, 1132}_0
c  in DIMACS:
-4553  4554 -4555  1131  4556 0
-4553  4554 -4555  1131  4557 0
-4553  4554 -4555  1131 -4558 0

c  -2-1 --> break 
c    ( b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-4553 -4554  4555  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1131}_2 ∧ -b^{1, 1131}_1 ∧ -b^{1, 1131}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1131}_2 ∨  b^{1, 1131}_1 ∨  b^{1, 1131}_0 ∨ false 
c  in DIMACS:
-4553  4554  4555  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧ true) 
c  in CNF:
c     b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ false 
c  in DIMACS:
 4553 -4554 -4555  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1131}_2 ∧  b^{1, 1131}_1 ∧  b^{1, 1131}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1131}_2 ∨ -b^{1, 1131}_1 ∨ -b^{1, 1131}_0 ∨ false 
c  in DIMACS:
-4553 -4554 -4555  0

c i = 1132
c  -2+1 --> -1
c    ( b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧  p_1132) -> ( b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0)
c  in CNF:
c    -b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨  b^{1, 1133}_2
c    -b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_1
c    -b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨  b^{1, 1133}_0
c  in DIMACS:
-4556 -4557  4558 -1132  4559 0
-4556 -4557  4558 -1132 -4560 0
-4556 -4557  4558 -1132  4561 0

c  -1+1 --> 0
c    ( b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧  p_1132) -> (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧ -b^{1, 1133}_0)
c  in CNF:
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_2
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_1
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_0
c  in DIMACS:
-4556  4557 -4558 -1132 -4559 0
-4556  4557 -4558 -1132 -4560 0
-4556  4557 -4558 -1132 -4561 0

c  0+1 --> 1
c    (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧  p_1132) -> (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0)
c  in CNF:
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_2
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_1
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨  b^{1, 1133}_0
c  in DIMACS:
 4556  4557  4558 -1132 -4559 0
 4556  4557  4558 -1132 -4560 0
 4556  4557  4558 -1132  4561 0

c  1+1 --> 2
c    (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧  p_1132) -> (-b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0)
c  in CNF:
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_2
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨  b^{1, 1133}_1
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ -p_1132 ∨ -b^{1, 1133}_0
c  in DIMACS:
 4556  4557 -4558 -1132 -4559 0
 4556  4557 -4558 -1132  4560 0
 4556  4557 -4558 -1132 -4561 0

c  2+1 --> break 
c    (-b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧  p_1132) -> break
c  in CNF:
c     b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ -p_1132 ∨ break
c  in DIMACS:
 4556 -4557  4558 -1132 1162 0


c  2-1 --> 1
c    (-b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧ -p_1132) -> (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0)
c  in CNF:
c     b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_2
c     b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_1
c     b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨  b^{1, 1133}_0
c  in DIMACS:
 4556 -4557  4558  1132 -4559 0
 4556 -4557  4558  1132 -4560 0
 4556 -4557  4558  1132  4561 0

c  1-1 --> 0
c    (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧ -p_1132) -> (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧ -b^{1, 1133}_0)
c  in CNF:
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_2
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_1
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_0
c  in DIMACS:
 4556  4557 -4558  1132 -4559 0
 4556  4557 -4558  1132 -4560 0
 4556  4557 -4558  1132 -4561 0

c  0-1 --> -1
c    (-b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧ -p_1132) -> ( b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0)
c  in CNF:
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨  b^{1, 1133}_2
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_1
c     b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨  b^{1, 1133}_0
c  in DIMACS:
 4556  4557  4558  1132  4559 0
 4556  4557  4558  1132 -4560 0
 4556  4557  4558  1132  4561 0

c  -1-1 --> -2
c    ( b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧ -p_1132) -> ( b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0)
c  in CNF:
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨  b^{1, 1133}_2
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨  b^{1, 1133}_1
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨  p_1132 ∨ -b^{1, 1133}_0
c  in DIMACS:
-4556  4557 -4558  1132  4559 0
-4556  4557 -4558  1132  4560 0
-4556  4557 -4558  1132 -4561 0

c  -2-1 --> break 
c    ( b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧ -p_1132) -> break
c  in CNF:
c    -b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨  p_1132 ∨ break
c  in DIMACS:
-4556 -4557  4558  1132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1132}_2 ∧ -b^{1, 1132}_1 ∧ -b^{1, 1132}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1132}_2 ∨  b^{1, 1132}_1 ∨  b^{1, 1132}_0 ∨ false 
c  in DIMACS:
-4556  4557  4558  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧ true) 
c  in CNF:
c     b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ false 
c  in DIMACS:
 4556 -4557 -4558  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1132}_2 ∧  b^{1, 1132}_1 ∧  b^{1, 1132}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1132}_2 ∨ -b^{1, 1132}_1 ∨ -b^{1, 1132}_0 ∨ false 
c  in DIMACS:
-4556 -4557 -4558  0

c i = 1133
c  -2+1 --> -1
c    ( b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧  p_1133) -> ( b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0)
c  in CNF:
c    -b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨  b^{1, 1134}_2
c    -b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_1
c    -b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨  b^{1, 1134}_0
c  in DIMACS:
-4559 -4560  4561 -1133  4562 0
-4559 -4560  4561 -1133 -4563 0
-4559 -4560  4561 -1133  4564 0

c  -1+1 --> 0
c    ( b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧  p_1133) -> (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧ -b^{1, 1134}_0)
c  in CNF:
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_2
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_1
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_0
c  in DIMACS:
-4559  4560 -4561 -1133 -4562 0
-4559  4560 -4561 -1133 -4563 0
-4559  4560 -4561 -1133 -4564 0

c  0+1 --> 1
c    (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧  p_1133) -> (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0)
c  in CNF:
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_2
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_1
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨  b^{1, 1134}_0
c  in DIMACS:
 4559  4560  4561 -1133 -4562 0
 4559  4560  4561 -1133 -4563 0
 4559  4560  4561 -1133  4564 0

c  1+1 --> 2
c    (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧  p_1133) -> (-b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0)
c  in CNF:
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_2
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨  b^{1, 1134}_1
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ -p_1133 ∨ -b^{1, 1134}_0
c  in DIMACS:
 4559  4560 -4561 -1133 -4562 0
 4559  4560 -4561 -1133  4563 0
 4559  4560 -4561 -1133 -4564 0

c  2+1 --> break 
c    (-b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧  p_1133) -> break
c  in CNF:
c     b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ -p_1133 ∨ break
c  in DIMACS:
 4559 -4560  4561 -1133 1162 0


c  2-1 --> 1
c    (-b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧ -p_1133) -> (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0)
c  in CNF:
c     b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_2
c     b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_1
c     b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨  b^{1, 1134}_0
c  in DIMACS:
 4559 -4560  4561  1133 -4562 0
 4559 -4560  4561  1133 -4563 0
 4559 -4560  4561  1133  4564 0

c  1-1 --> 0
c    (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧ -p_1133) -> (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧ -b^{1, 1134}_0)
c  in CNF:
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_2
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_1
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_0
c  in DIMACS:
 4559  4560 -4561  1133 -4562 0
 4559  4560 -4561  1133 -4563 0
 4559  4560 -4561  1133 -4564 0

c  0-1 --> -1
c    (-b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧ -p_1133) -> ( b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0)
c  in CNF:
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨  b^{1, 1134}_2
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_1
c     b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨  b^{1, 1134}_0
c  in DIMACS:
 4559  4560  4561  1133  4562 0
 4559  4560  4561  1133 -4563 0
 4559  4560  4561  1133  4564 0

c  -1-1 --> -2
c    ( b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧ -p_1133) -> ( b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0)
c  in CNF:
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨  b^{1, 1134}_2
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨  b^{1, 1134}_1
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨  p_1133 ∨ -b^{1, 1134}_0
c  in DIMACS:
-4559  4560 -4561  1133  4562 0
-4559  4560 -4561  1133  4563 0
-4559  4560 -4561  1133 -4564 0

c  -2-1 --> break 
c    ( b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧ -p_1133) -> break
c  in CNF:
c    -b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨  p_1133 ∨ break
c  in DIMACS:
-4559 -4560  4561  1133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1133}_2 ∧ -b^{1, 1133}_1 ∧ -b^{1, 1133}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1133}_2 ∨  b^{1, 1133}_1 ∨  b^{1, 1133}_0 ∨ false 
c  in DIMACS:
-4559  4560  4561  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧ true) 
c  in CNF:
c     b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ false 
c  in DIMACS:
 4559 -4560 -4561  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1133}_2 ∧  b^{1, 1133}_1 ∧  b^{1, 1133}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1133}_2 ∨ -b^{1, 1133}_1 ∨ -b^{1, 1133}_0 ∨ false 
c  in DIMACS:
-4559 -4560 -4561  0

c i = 1134
c  -2+1 --> -1
c    ( b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧  p_1134) -> ( b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0)
c  in CNF:
c    -b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨  b^{1, 1135}_2
c    -b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_1
c    -b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨  b^{1, 1135}_0
c  in DIMACS:
-4562 -4563  4564 -1134  4565 0
-4562 -4563  4564 -1134 -4566 0
-4562 -4563  4564 -1134  4567 0

c  -1+1 --> 0
c    ( b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧  p_1134) -> (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧ -b^{1, 1135}_0)
c  in CNF:
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_2
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_1
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_0
c  in DIMACS:
-4562  4563 -4564 -1134 -4565 0
-4562  4563 -4564 -1134 -4566 0
-4562  4563 -4564 -1134 -4567 0

c  0+1 --> 1
c    (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧  p_1134) -> (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0)
c  in CNF:
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_2
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_1
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨  b^{1, 1135}_0
c  in DIMACS:
 4562  4563  4564 -1134 -4565 0
 4562  4563  4564 -1134 -4566 0
 4562  4563  4564 -1134  4567 0

c  1+1 --> 2
c    (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧  p_1134) -> (-b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0)
c  in CNF:
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_2
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨  b^{1, 1135}_1
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ -p_1134 ∨ -b^{1, 1135}_0
c  in DIMACS:
 4562  4563 -4564 -1134 -4565 0
 4562  4563 -4564 -1134  4566 0
 4562  4563 -4564 -1134 -4567 0

c  2+1 --> break 
c    (-b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 4562 -4563  4564 -1134 1162 0


c  2-1 --> 1
c    (-b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧ -p_1134) -> (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0)
c  in CNF:
c     b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_2
c     b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_1
c     b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨  b^{1, 1135}_0
c  in DIMACS:
 4562 -4563  4564  1134 -4565 0
 4562 -4563  4564  1134 -4566 0
 4562 -4563  4564  1134  4567 0

c  1-1 --> 0
c    (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧ -p_1134) -> (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧ -b^{1, 1135}_0)
c  in CNF:
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_2
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_1
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_0
c  in DIMACS:
 4562  4563 -4564  1134 -4565 0
 4562  4563 -4564  1134 -4566 0
 4562  4563 -4564  1134 -4567 0

c  0-1 --> -1
c    (-b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧ -p_1134) -> ( b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0)
c  in CNF:
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨  b^{1, 1135}_2
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_1
c     b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨  b^{1, 1135}_0
c  in DIMACS:
 4562  4563  4564  1134  4565 0
 4562  4563  4564  1134 -4566 0
 4562  4563  4564  1134  4567 0

c  -1-1 --> -2
c    ( b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧ -p_1134) -> ( b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0)
c  in CNF:
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨  b^{1, 1135}_2
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨  b^{1, 1135}_1
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨  p_1134 ∨ -b^{1, 1135}_0
c  in DIMACS:
-4562  4563 -4564  1134  4565 0
-4562  4563 -4564  1134  4566 0
-4562  4563 -4564  1134 -4567 0

c  -2-1 --> break 
c    ( b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-4562 -4563  4564  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1134}_2 ∧ -b^{1, 1134}_1 ∧ -b^{1, 1134}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1134}_2 ∨  b^{1, 1134}_1 ∨  b^{1, 1134}_0 ∨ false 
c  in DIMACS:
-4562  4563  4564  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧ true) 
c  in CNF:
c     b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ false 
c  in DIMACS:
 4562 -4563 -4564  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1134}_2 ∧  b^{1, 1134}_1 ∧  b^{1, 1134}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1134}_2 ∨ -b^{1, 1134}_1 ∨ -b^{1, 1134}_0 ∨ false 
c  in DIMACS:
-4562 -4563 -4564  0

c i = 1135
c  -2+1 --> -1
c    ( b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧  p_1135) -> ( b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0)
c  in CNF:
c    -b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨  b^{1, 1136}_2
c    -b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_1
c    -b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨  b^{1, 1136}_0
c  in DIMACS:
-4565 -4566  4567 -1135  4568 0
-4565 -4566  4567 -1135 -4569 0
-4565 -4566  4567 -1135  4570 0

c  -1+1 --> 0
c    ( b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧  p_1135) -> (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧ -b^{1, 1136}_0)
c  in CNF:
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_2
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_1
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_0
c  in DIMACS:
-4565  4566 -4567 -1135 -4568 0
-4565  4566 -4567 -1135 -4569 0
-4565  4566 -4567 -1135 -4570 0

c  0+1 --> 1
c    (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧  p_1135) -> (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0)
c  in CNF:
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_2
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_1
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨  b^{1, 1136}_0
c  in DIMACS:
 4565  4566  4567 -1135 -4568 0
 4565  4566  4567 -1135 -4569 0
 4565  4566  4567 -1135  4570 0

c  1+1 --> 2
c    (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧  p_1135) -> (-b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0)
c  in CNF:
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_2
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨  b^{1, 1136}_1
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ -p_1135 ∨ -b^{1, 1136}_0
c  in DIMACS:
 4565  4566 -4567 -1135 -4568 0
 4565  4566 -4567 -1135  4569 0
 4565  4566 -4567 -1135 -4570 0

c  2+1 --> break 
c    (-b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧  p_1135) -> break
c  in CNF:
c     b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ -p_1135 ∨ break
c  in DIMACS:
 4565 -4566  4567 -1135 1162 0


c  2-1 --> 1
c    (-b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧ -p_1135) -> (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0)
c  in CNF:
c     b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_2
c     b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_1
c     b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨  b^{1, 1136}_0
c  in DIMACS:
 4565 -4566  4567  1135 -4568 0
 4565 -4566  4567  1135 -4569 0
 4565 -4566  4567  1135  4570 0

c  1-1 --> 0
c    (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧ -p_1135) -> (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧ -b^{1, 1136}_0)
c  in CNF:
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_2
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_1
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_0
c  in DIMACS:
 4565  4566 -4567  1135 -4568 0
 4565  4566 -4567  1135 -4569 0
 4565  4566 -4567  1135 -4570 0

c  0-1 --> -1
c    (-b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧ -p_1135) -> ( b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0)
c  in CNF:
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨  b^{1, 1136}_2
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_1
c     b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨  b^{1, 1136}_0
c  in DIMACS:
 4565  4566  4567  1135  4568 0
 4565  4566  4567  1135 -4569 0
 4565  4566  4567  1135  4570 0

c  -1-1 --> -2
c    ( b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧ -p_1135) -> ( b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0)
c  in CNF:
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨  b^{1, 1136}_2
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨  b^{1, 1136}_1
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨  p_1135 ∨ -b^{1, 1136}_0
c  in DIMACS:
-4565  4566 -4567  1135  4568 0
-4565  4566 -4567  1135  4569 0
-4565  4566 -4567  1135 -4570 0

c  -2-1 --> break 
c    ( b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧ -p_1135) -> break
c  in CNF:
c    -b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨  p_1135 ∨ break
c  in DIMACS:
-4565 -4566  4567  1135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1135}_2 ∧ -b^{1, 1135}_1 ∧ -b^{1, 1135}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1135}_2 ∨  b^{1, 1135}_1 ∨  b^{1, 1135}_0 ∨ false 
c  in DIMACS:
-4565  4566  4567  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧ true) 
c  in CNF:
c     b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ false 
c  in DIMACS:
 4565 -4566 -4567  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1135}_2 ∧  b^{1, 1135}_1 ∧  b^{1, 1135}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1135}_2 ∨ -b^{1, 1135}_1 ∨ -b^{1, 1135}_0 ∨ false 
c  in DIMACS:
-4565 -4566 -4567  0

c i = 1136
c  -2+1 --> -1
c    ( b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧  p_1136) -> ( b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0)
c  in CNF:
c    -b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨  b^{1, 1137}_2
c    -b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_1
c    -b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨  b^{1, 1137}_0
c  in DIMACS:
-4568 -4569  4570 -1136  4571 0
-4568 -4569  4570 -1136 -4572 0
-4568 -4569  4570 -1136  4573 0

c  -1+1 --> 0
c    ( b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧  p_1136) -> (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧ -b^{1, 1137}_0)
c  in CNF:
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_2
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_1
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_0
c  in DIMACS:
-4568  4569 -4570 -1136 -4571 0
-4568  4569 -4570 -1136 -4572 0
-4568  4569 -4570 -1136 -4573 0

c  0+1 --> 1
c    (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧  p_1136) -> (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0)
c  in CNF:
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_2
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_1
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨  b^{1, 1137}_0
c  in DIMACS:
 4568  4569  4570 -1136 -4571 0
 4568  4569  4570 -1136 -4572 0
 4568  4569  4570 -1136  4573 0

c  1+1 --> 2
c    (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧  p_1136) -> (-b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0)
c  in CNF:
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_2
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨  b^{1, 1137}_1
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ -p_1136 ∨ -b^{1, 1137}_0
c  in DIMACS:
 4568  4569 -4570 -1136 -4571 0
 4568  4569 -4570 -1136  4572 0
 4568  4569 -4570 -1136 -4573 0

c  2+1 --> break 
c    (-b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 4568 -4569  4570 -1136 1162 0


c  2-1 --> 1
c    (-b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧ -p_1136) -> (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0)
c  in CNF:
c     b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_2
c     b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_1
c     b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨  b^{1, 1137}_0
c  in DIMACS:
 4568 -4569  4570  1136 -4571 0
 4568 -4569  4570  1136 -4572 0
 4568 -4569  4570  1136  4573 0

c  1-1 --> 0
c    (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧ -p_1136) -> (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧ -b^{1, 1137}_0)
c  in CNF:
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_2
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_1
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_0
c  in DIMACS:
 4568  4569 -4570  1136 -4571 0
 4568  4569 -4570  1136 -4572 0
 4568  4569 -4570  1136 -4573 0

c  0-1 --> -1
c    (-b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧ -p_1136) -> ( b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0)
c  in CNF:
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨  b^{1, 1137}_2
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_1
c     b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨  b^{1, 1137}_0
c  in DIMACS:
 4568  4569  4570  1136  4571 0
 4568  4569  4570  1136 -4572 0
 4568  4569  4570  1136  4573 0

c  -1-1 --> -2
c    ( b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧ -p_1136) -> ( b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0)
c  in CNF:
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨  b^{1, 1137}_2
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨  b^{1, 1137}_1
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨  p_1136 ∨ -b^{1, 1137}_0
c  in DIMACS:
-4568  4569 -4570  1136  4571 0
-4568  4569 -4570  1136  4572 0
-4568  4569 -4570  1136 -4573 0

c  -2-1 --> break 
c    ( b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-4568 -4569  4570  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1136}_2 ∧ -b^{1, 1136}_1 ∧ -b^{1, 1136}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1136}_2 ∨  b^{1, 1136}_1 ∨  b^{1, 1136}_0 ∨ false 
c  in DIMACS:
-4568  4569  4570  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧ true) 
c  in CNF:
c     b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ false 
c  in DIMACS:
 4568 -4569 -4570  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1136}_2 ∧  b^{1, 1136}_1 ∧  b^{1, 1136}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1136}_2 ∨ -b^{1, 1136}_1 ∨ -b^{1, 1136}_0 ∨ false 
c  in DIMACS:
-4568 -4569 -4570  0

c i = 1137
c  -2+1 --> -1
c    ( b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧  p_1137) -> ( b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0)
c  in CNF:
c    -b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨  b^{1, 1138}_2
c    -b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_1
c    -b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨  b^{1, 1138}_0
c  in DIMACS:
-4571 -4572  4573 -1137  4574 0
-4571 -4572  4573 -1137 -4575 0
-4571 -4572  4573 -1137  4576 0

c  -1+1 --> 0
c    ( b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧  p_1137) -> (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧ -b^{1, 1138}_0)
c  in CNF:
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_2
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_1
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_0
c  in DIMACS:
-4571  4572 -4573 -1137 -4574 0
-4571  4572 -4573 -1137 -4575 0
-4571  4572 -4573 -1137 -4576 0

c  0+1 --> 1
c    (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧  p_1137) -> (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0)
c  in CNF:
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_2
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_1
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨  b^{1, 1138}_0
c  in DIMACS:
 4571  4572  4573 -1137 -4574 0
 4571  4572  4573 -1137 -4575 0
 4571  4572  4573 -1137  4576 0

c  1+1 --> 2
c    (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧  p_1137) -> (-b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0)
c  in CNF:
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_2
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨  b^{1, 1138}_1
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ -p_1137 ∨ -b^{1, 1138}_0
c  in DIMACS:
 4571  4572 -4573 -1137 -4574 0
 4571  4572 -4573 -1137  4575 0
 4571  4572 -4573 -1137 -4576 0

c  2+1 --> break 
c    (-b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧  p_1137) -> break
c  in CNF:
c     b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ -p_1137 ∨ break
c  in DIMACS:
 4571 -4572  4573 -1137 1162 0


c  2-1 --> 1
c    (-b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧ -p_1137) -> (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0)
c  in CNF:
c     b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_2
c     b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_1
c     b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨  b^{1, 1138}_0
c  in DIMACS:
 4571 -4572  4573  1137 -4574 0
 4571 -4572  4573  1137 -4575 0
 4571 -4572  4573  1137  4576 0

c  1-1 --> 0
c    (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧ -p_1137) -> (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧ -b^{1, 1138}_0)
c  in CNF:
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_2
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_1
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_0
c  in DIMACS:
 4571  4572 -4573  1137 -4574 0
 4571  4572 -4573  1137 -4575 0
 4571  4572 -4573  1137 -4576 0

c  0-1 --> -1
c    (-b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧ -p_1137) -> ( b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0)
c  in CNF:
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨  b^{1, 1138}_2
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_1
c     b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨  b^{1, 1138}_0
c  in DIMACS:
 4571  4572  4573  1137  4574 0
 4571  4572  4573  1137 -4575 0
 4571  4572  4573  1137  4576 0

c  -1-1 --> -2
c    ( b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧ -p_1137) -> ( b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0)
c  in CNF:
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨  b^{1, 1138}_2
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨  b^{1, 1138}_1
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨  p_1137 ∨ -b^{1, 1138}_0
c  in DIMACS:
-4571  4572 -4573  1137  4574 0
-4571  4572 -4573  1137  4575 0
-4571  4572 -4573  1137 -4576 0

c  -2-1 --> break 
c    ( b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧ -p_1137) -> break
c  in CNF:
c    -b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨  p_1137 ∨ break
c  in DIMACS:
-4571 -4572  4573  1137 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1137}_2 ∧ -b^{1, 1137}_1 ∧ -b^{1, 1137}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1137}_2 ∨  b^{1, 1137}_1 ∨  b^{1, 1137}_0 ∨ false 
c  in DIMACS:
-4571  4572  4573  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧ true) 
c  in CNF:
c     b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ false 
c  in DIMACS:
 4571 -4572 -4573  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1137}_2 ∧  b^{1, 1137}_1 ∧  b^{1, 1137}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1137}_2 ∨ -b^{1, 1137}_1 ∨ -b^{1, 1137}_0 ∨ false 
c  in DIMACS:
-4571 -4572 -4573  0

c i = 1138
c  -2+1 --> -1
c    ( b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧  p_1138) -> ( b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0)
c  in CNF:
c    -b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨  b^{1, 1139}_2
c    -b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_1
c    -b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨  b^{1, 1139}_0
c  in DIMACS:
-4574 -4575  4576 -1138  4577 0
-4574 -4575  4576 -1138 -4578 0
-4574 -4575  4576 -1138  4579 0

c  -1+1 --> 0
c    ( b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧  p_1138) -> (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧ -b^{1, 1139}_0)
c  in CNF:
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_2
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_1
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_0
c  in DIMACS:
-4574  4575 -4576 -1138 -4577 0
-4574  4575 -4576 -1138 -4578 0
-4574  4575 -4576 -1138 -4579 0

c  0+1 --> 1
c    (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧  p_1138) -> (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0)
c  in CNF:
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_2
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_1
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨  b^{1, 1139}_0
c  in DIMACS:
 4574  4575  4576 -1138 -4577 0
 4574  4575  4576 -1138 -4578 0
 4574  4575  4576 -1138  4579 0

c  1+1 --> 2
c    (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧  p_1138) -> (-b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0)
c  in CNF:
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_2
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨  b^{1, 1139}_1
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ -p_1138 ∨ -b^{1, 1139}_0
c  in DIMACS:
 4574  4575 -4576 -1138 -4577 0
 4574  4575 -4576 -1138  4578 0
 4574  4575 -4576 -1138 -4579 0

c  2+1 --> break 
c    (-b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧  p_1138) -> break
c  in CNF:
c     b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ -p_1138 ∨ break
c  in DIMACS:
 4574 -4575  4576 -1138 1162 0


c  2-1 --> 1
c    (-b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧ -p_1138) -> (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0)
c  in CNF:
c     b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_2
c     b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_1
c     b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨  b^{1, 1139}_0
c  in DIMACS:
 4574 -4575  4576  1138 -4577 0
 4574 -4575  4576  1138 -4578 0
 4574 -4575  4576  1138  4579 0

c  1-1 --> 0
c    (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧ -p_1138) -> (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧ -b^{1, 1139}_0)
c  in CNF:
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_2
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_1
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_0
c  in DIMACS:
 4574  4575 -4576  1138 -4577 0
 4574  4575 -4576  1138 -4578 0
 4574  4575 -4576  1138 -4579 0

c  0-1 --> -1
c    (-b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧ -p_1138) -> ( b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0)
c  in CNF:
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨  b^{1, 1139}_2
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_1
c     b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨  b^{1, 1139}_0
c  in DIMACS:
 4574  4575  4576  1138  4577 0
 4574  4575  4576  1138 -4578 0
 4574  4575  4576  1138  4579 0

c  -1-1 --> -2
c    ( b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧ -p_1138) -> ( b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0)
c  in CNF:
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨  b^{1, 1139}_2
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨  b^{1, 1139}_1
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨  p_1138 ∨ -b^{1, 1139}_0
c  in DIMACS:
-4574  4575 -4576  1138  4577 0
-4574  4575 -4576  1138  4578 0
-4574  4575 -4576  1138 -4579 0

c  -2-1 --> break 
c    ( b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧ -p_1138) -> break
c  in CNF:
c    -b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨  p_1138 ∨ break
c  in DIMACS:
-4574 -4575  4576  1138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1138}_2 ∧ -b^{1, 1138}_1 ∧ -b^{1, 1138}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1138}_2 ∨  b^{1, 1138}_1 ∨  b^{1, 1138}_0 ∨ false 
c  in DIMACS:
-4574  4575  4576  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧ true) 
c  in CNF:
c     b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ false 
c  in DIMACS:
 4574 -4575 -4576  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1138}_2 ∧  b^{1, 1138}_1 ∧  b^{1, 1138}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1138}_2 ∨ -b^{1, 1138}_1 ∨ -b^{1, 1138}_0 ∨ false 
c  in DIMACS:
-4574 -4575 -4576  0

c i = 1139
c  -2+1 --> -1
c    ( b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧  p_1139) -> ( b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0)
c  in CNF:
c    -b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨  b^{1, 1140}_2
c    -b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_1
c    -b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨  b^{1, 1140}_0
c  in DIMACS:
-4577 -4578  4579 -1139  4580 0
-4577 -4578  4579 -1139 -4581 0
-4577 -4578  4579 -1139  4582 0

c  -1+1 --> 0
c    ( b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧  p_1139) -> (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧ -b^{1, 1140}_0)
c  in CNF:
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_2
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_1
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_0
c  in DIMACS:
-4577  4578 -4579 -1139 -4580 0
-4577  4578 -4579 -1139 -4581 0
-4577  4578 -4579 -1139 -4582 0

c  0+1 --> 1
c    (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧  p_1139) -> (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0)
c  in CNF:
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_2
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_1
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨  b^{1, 1140}_0
c  in DIMACS:
 4577  4578  4579 -1139 -4580 0
 4577  4578  4579 -1139 -4581 0
 4577  4578  4579 -1139  4582 0

c  1+1 --> 2
c    (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧  p_1139) -> (-b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0)
c  in CNF:
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_2
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨  b^{1, 1140}_1
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ -p_1139 ∨ -b^{1, 1140}_0
c  in DIMACS:
 4577  4578 -4579 -1139 -4580 0
 4577  4578 -4579 -1139  4581 0
 4577  4578 -4579 -1139 -4582 0

c  2+1 --> break 
c    (-b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧  p_1139) -> break
c  in CNF:
c     b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ -p_1139 ∨ break
c  in DIMACS:
 4577 -4578  4579 -1139 1162 0


c  2-1 --> 1
c    (-b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧ -p_1139) -> (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0)
c  in CNF:
c     b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_2
c     b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_1
c     b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨  b^{1, 1140}_0
c  in DIMACS:
 4577 -4578  4579  1139 -4580 0
 4577 -4578  4579  1139 -4581 0
 4577 -4578  4579  1139  4582 0

c  1-1 --> 0
c    (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧ -p_1139) -> (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧ -b^{1, 1140}_0)
c  in CNF:
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_2
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_1
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_0
c  in DIMACS:
 4577  4578 -4579  1139 -4580 0
 4577  4578 -4579  1139 -4581 0
 4577  4578 -4579  1139 -4582 0

c  0-1 --> -1
c    (-b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧ -p_1139) -> ( b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0)
c  in CNF:
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨  b^{1, 1140}_2
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_1
c     b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨  b^{1, 1140}_0
c  in DIMACS:
 4577  4578  4579  1139  4580 0
 4577  4578  4579  1139 -4581 0
 4577  4578  4579  1139  4582 0

c  -1-1 --> -2
c    ( b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧ -p_1139) -> ( b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0)
c  in CNF:
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨  b^{1, 1140}_2
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨  b^{1, 1140}_1
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨  p_1139 ∨ -b^{1, 1140}_0
c  in DIMACS:
-4577  4578 -4579  1139  4580 0
-4577  4578 -4579  1139  4581 0
-4577  4578 -4579  1139 -4582 0

c  -2-1 --> break 
c    ( b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧ -p_1139) -> break
c  in CNF:
c    -b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨  p_1139 ∨ break
c  in DIMACS:
-4577 -4578  4579  1139 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1139}_2 ∧ -b^{1, 1139}_1 ∧ -b^{1, 1139}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1139}_2 ∨  b^{1, 1139}_1 ∨  b^{1, 1139}_0 ∨ false 
c  in DIMACS:
-4577  4578  4579  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧ true) 
c  in CNF:
c     b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ false 
c  in DIMACS:
 4577 -4578 -4579  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1139}_2 ∧  b^{1, 1139}_1 ∧  b^{1, 1139}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1139}_2 ∨ -b^{1, 1139}_1 ∨ -b^{1, 1139}_0 ∨ false 
c  in DIMACS:
-4577 -4578 -4579  0

c i = 1140
c  -2+1 --> -1
c    ( b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧  p_1140) -> ( b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0)
c  in CNF:
c    -b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨  b^{1, 1141}_2
c    -b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_1
c    -b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨  b^{1, 1141}_0
c  in DIMACS:
-4580 -4581  4582 -1140  4583 0
-4580 -4581  4582 -1140 -4584 0
-4580 -4581  4582 -1140  4585 0

c  -1+1 --> 0
c    ( b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧  p_1140) -> (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧ -b^{1, 1141}_0)
c  in CNF:
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_2
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_1
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_0
c  in DIMACS:
-4580  4581 -4582 -1140 -4583 0
-4580  4581 -4582 -1140 -4584 0
-4580  4581 -4582 -1140 -4585 0

c  0+1 --> 1
c    (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧  p_1140) -> (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0)
c  in CNF:
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_2
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_1
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨  b^{1, 1141}_0
c  in DIMACS:
 4580  4581  4582 -1140 -4583 0
 4580  4581  4582 -1140 -4584 0
 4580  4581  4582 -1140  4585 0

c  1+1 --> 2
c    (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧  p_1140) -> (-b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0)
c  in CNF:
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_2
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨  b^{1, 1141}_1
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ -p_1140 ∨ -b^{1, 1141}_0
c  in DIMACS:
 4580  4581 -4582 -1140 -4583 0
 4580  4581 -4582 -1140  4584 0
 4580  4581 -4582 -1140 -4585 0

c  2+1 --> break 
c    (-b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 4580 -4581  4582 -1140 1162 0


c  2-1 --> 1
c    (-b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧ -p_1140) -> (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0)
c  in CNF:
c     b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_2
c     b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_1
c     b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨  b^{1, 1141}_0
c  in DIMACS:
 4580 -4581  4582  1140 -4583 0
 4580 -4581  4582  1140 -4584 0
 4580 -4581  4582  1140  4585 0

c  1-1 --> 0
c    (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧ -p_1140) -> (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧ -b^{1, 1141}_0)
c  in CNF:
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_2
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_1
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_0
c  in DIMACS:
 4580  4581 -4582  1140 -4583 0
 4580  4581 -4582  1140 -4584 0
 4580  4581 -4582  1140 -4585 0

c  0-1 --> -1
c    (-b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧ -p_1140) -> ( b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0)
c  in CNF:
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨  b^{1, 1141}_2
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_1
c     b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨  b^{1, 1141}_0
c  in DIMACS:
 4580  4581  4582  1140  4583 0
 4580  4581  4582  1140 -4584 0
 4580  4581  4582  1140  4585 0

c  -1-1 --> -2
c    ( b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧ -p_1140) -> ( b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0)
c  in CNF:
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨  b^{1, 1141}_2
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨  b^{1, 1141}_1
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨  p_1140 ∨ -b^{1, 1141}_0
c  in DIMACS:
-4580  4581 -4582  1140  4583 0
-4580  4581 -4582  1140  4584 0
-4580  4581 -4582  1140 -4585 0

c  -2-1 --> break 
c    ( b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-4580 -4581  4582  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1140}_2 ∧ -b^{1, 1140}_1 ∧ -b^{1, 1140}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1140}_2 ∨  b^{1, 1140}_1 ∨  b^{1, 1140}_0 ∨ false 
c  in DIMACS:
-4580  4581  4582  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧ true) 
c  in CNF:
c     b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ false 
c  in DIMACS:
 4580 -4581 -4582  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1140}_2 ∧  b^{1, 1140}_1 ∧  b^{1, 1140}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1140}_2 ∨ -b^{1, 1140}_1 ∨ -b^{1, 1140}_0 ∨ false 
c  in DIMACS:
-4580 -4581 -4582  0

c i = 1141
c  -2+1 --> -1
c    ( b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧  p_1141) -> ( b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0)
c  in CNF:
c    -b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨  b^{1, 1142}_2
c    -b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_1
c    -b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨  b^{1, 1142}_0
c  in DIMACS:
-4583 -4584  4585 -1141  4586 0
-4583 -4584  4585 -1141 -4587 0
-4583 -4584  4585 -1141  4588 0

c  -1+1 --> 0
c    ( b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧  p_1141) -> (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧ -b^{1, 1142}_0)
c  in CNF:
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_2
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_1
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_0
c  in DIMACS:
-4583  4584 -4585 -1141 -4586 0
-4583  4584 -4585 -1141 -4587 0
-4583  4584 -4585 -1141 -4588 0

c  0+1 --> 1
c    (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧  p_1141) -> (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0)
c  in CNF:
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_2
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_1
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨  b^{1, 1142}_0
c  in DIMACS:
 4583  4584  4585 -1141 -4586 0
 4583  4584  4585 -1141 -4587 0
 4583  4584  4585 -1141  4588 0

c  1+1 --> 2
c    (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧  p_1141) -> (-b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0)
c  in CNF:
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_2
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨  b^{1, 1142}_1
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ -p_1141 ∨ -b^{1, 1142}_0
c  in DIMACS:
 4583  4584 -4585 -1141 -4586 0
 4583  4584 -4585 -1141  4587 0
 4583  4584 -4585 -1141 -4588 0

c  2+1 --> break 
c    (-b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧  p_1141) -> break
c  in CNF:
c     b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ -p_1141 ∨ break
c  in DIMACS:
 4583 -4584  4585 -1141 1162 0


c  2-1 --> 1
c    (-b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧ -p_1141) -> (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0)
c  in CNF:
c     b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_2
c     b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_1
c     b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨  b^{1, 1142}_0
c  in DIMACS:
 4583 -4584  4585  1141 -4586 0
 4583 -4584  4585  1141 -4587 0
 4583 -4584  4585  1141  4588 0

c  1-1 --> 0
c    (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧ -p_1141) -> (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧ -b^{1, 1142}_0)
c  in CNF:
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_2
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_1
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_0
c  in DIMACS:
 4583  4584 -4585  1141 -4586 0
 4583  4584 -4585  1141 -4587 0
 4583  4584 -4585  1141 -4588 0

c  0-1 --> -1
c    (-b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧ -p_1141) -> ( b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0)
c  in CNF:
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨  b^{1, 1142}_2
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_1
c     b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨  b^{1, 1142}_0
c  in DIMACS:
 4583  4584  4585  1141  4586 0
 4583  4584  4585  1141 -4587 0
 4583  4584  4585  1141  4588 0

c  -1-1 --> -2
c    ( b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧ -p_1141) -> ( b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0)
c  in CNF:
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨  b^{1, 1142}_2
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨  b^{1, 1142}_1
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨  p_1141 ∨ -b^{1, 1142}_0
c  in DIMACS:
-4583  4584 -4585  1141  4586 0
-4583  4584 -4585  1141  4587 0
-4583  4584 -4585  1141 -4588 0

c  -2-1 --> break 
c    ( b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧ -p_1141) -> break
c  in CNF:
c    -b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨  p_1141 ∨ break
c  in DIMACS:
-4583 -4584  4585  1141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1141}_2 ∧ -b^{1, 1141}_1 ∧ -b^{1, 1141}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1141}_2 ∨  b^{1, 1141}_1 ∨  b^{1, 1141}_0 ∨ false 
c  in DIMACS:
-4583  4584  4585  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧ true) 
c  in CNF:
c     b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ false 
c  in DIMACS:
 4583 -4584 -4585  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1141}_2 ∧  b^{1, 1141}_1 ∧  b^{1, 1141}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1141}_2 ∨ -b^{1, 1141}_1 ∨ -b^{1, 1141}_0 ∨ false 
c  in DIMACS:
-4583 -4584 -4585  0

c i = 1142
c  -2+1 --> -1
c    ( b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧  p_1142) -> ( b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0)
c  in CNF:
c    -b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨  b^{1, 1143}_2
c    -b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_1
c    -b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨  b^{1, 1143}_0
c  in DIMACS:
-4586 -4587  4588 -1142  4589 0
-4586 -4587  4588 -1142 -4590 0
-4586 -4587  4588 -1142  4591 0

c  -1+1 --> 0
c    ( b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧  p_1142) -> (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧ -b^{1, 1143}_0)
c  in CNF:
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_2
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_1
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_0
c  in DIMACS:
-4586  4587 -4588 -1142 -4589 0
-4586  4587 -4588 -1142 -4590 0
-4586  4587 -4588 -1142 -4591 0

c  0+1 --> 1
c    (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧  p_1142) -> (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0)
c  in CNF:
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_2
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_1
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨  b^{1, 1143}_0
c  in DIMACS:
 4586  4587  4588 -1142 -4589 0
 4586  4587  4588 -1142 -4590 0
 4586  4587  4588 -1142  4591 0

c  1+1 --> 2
c    (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧  p_1142) -> (-b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0)
c  in CNF:
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_2
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨  b^{1, 1143}_1
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ -p_1142 ∨ -b^{1, 1143}_0
c  in DIMACS:
 4586  4587 -4588 -1142 -4589 0
 4586  4587 -4588 -1142  4590 0
 4586  4587 -4588 -1142 -4591 0

c  2+1 --> break 
c    (-b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧  p_1142) -> break
c  in CNF:
c     b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ -p_1142 ∨ break
c  in DIMACS:
 4586 -4587  4588 -1142 1162 0


c  2-1 --> 1
c    (-b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧ -p_1142) -> (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0)
c  in CNF:
c     b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_2
c     b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_1
c     b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨  b^{1, 1143}_0
c  in DIMACS:
 4586 -4587  4588  1142 -4589 0
 4586 -4587  4588  1142 -4590 0
 4586 -4587  4588  1142  4591 0

c  1-1 --> 0
c    (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧ -p_1142) -> (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧ -b^{1, 1143}_0)
c  in CNF:
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_2
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_1
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_0
c  in DIMACS:
 4586  4587 -4588  1142 -4589 0
 4586  4587 -4588  1142 -4590 0
 4586  4587 -4588  1142 -4591 0

c  0-1 --> -1
c    (-b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧ -p_1142) -> ( b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0)
c  in CNF:
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨  b^{1, 1143}_2
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_1
c     b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨  b^{1, 1143}_0
c  in DIMACS:
 4586  4587  4588  1142  4589 0
 4586  4587  4588  1142 -4590 0
 4586  4587  4588  1142  4591 0

c  -1-1 --> -2
c    ( b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧ -p_1142) -> ( b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0)
c  in CNF:
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨  b^{1, 1143}_2
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨  b^{1, 1143}_1
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨  p_1142 ∨ -b^{1, 1143}_0
c  in DIMACS:
-4586  4587 -4588  1142  4589 0
-4586  4587 -4588  1142  4590 0
-4586  4587 -4588  1142 -4591 0

c  -2-1 --> break 
c    ( b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧ -p_1142) -> break
c  in CNF:
c    -b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨  p_1142 ∨ break
c  in DIMACS:
-4586 -4587  4588  1142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1142}_2 ∧ -b^{1, 1142}_1 ∧ -b^{1, 1142}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1142}_2 ∨  b^{1, 1142}_1 ∨  b^{1, 1142}_0 ∨ false 
c  in DIMACS:
-4586  4587  4588  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧ true) 
c  in CNF:
c     b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ false 
c  in DIMACS:
 4586 -4587 -4588  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1142}_2 ∧  b^{1, 1142}_1 ∧  b^{1, 1142}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1142}_2 ∨ -b^{1, 1142}_1 ∨ -b^{1, 1142}_0 ∨ false 
c  in DIMACS:
-4586 -4587 -4588  0

c i = 1143
c  -2+1 --> -1
c    ( b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧  p_1143) -> ( b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0)
c  in CNF:
c    -b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨  b^{1, 1144}_2
c    -b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_1
c    -b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨  b^{1, 1144}_0
c  in DIMACS:
-4589 -4590  4591 -1143  4592 0
-4589 -4590  4591 -1143 -4593 0
-4589 -4590  4591 -1143  4594 0

c  -1+1 --> 0
c    ( b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧  p_1143) -> (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧ -b^{1, 1144}_0)
c  in CNF:
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_2
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_1
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_0
c  in DIMACS:
-4589  4590 -4591 -1143 -4592 0
-4589  4590 -4591 -1143 -4593 0
-4589  4590 -4591 -1143 -4594 0

c  0+1 --> 1
c    (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧  p_1143) -> (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0)
c  in CNF:
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_2
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_1
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨  b^{1, 1144}_0
c  in DIMACS:
 4589  4590  4591 -1143 -4592 0
 4589  4590  4591 -1143 -4593 0
 4589  4590  4591 -1143  4594 0

c  1+1 --> 2
c    (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧  p_1143) -> (-b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0)
c  in CNF:
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_2
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨  b^{1, 1144}_1
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ -p_1143 ∨ -b^{1, 1144}_0
c  in DIMACS:
 4589  4590 -4591 -1143 -4592 0
 4589  4590 -4591 -1143  4593 0
 4589  4590 -4591 -1143 -4594 0

c  2+1 --> break 
c    (-b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧  p_1143) -> break
c  in CNF:
c     b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ -p_1143 ∨ break
c  in DIMACS:
 4589 -4590  4591 -1143 1162 0


c  2-1 --> 1
c    (-b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧ -p_1143) -> (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0)
c  in CNF:
c     b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_2
c     b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_1
c     b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨  b^{1, 1144}_0
c  in DIMACS:
 4589 -4590  4591  1143 -4592 0
 4589 -4590  4591  1143 -4593 0
 4589 -4590  4591  1143  4594 0

c  1-1 --> 0
c    (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧ -p_1143) -> (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧ -b^{1, 1144}_0)
c  in CNF:
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_2
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_1
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_0
c  in DIMACS:
 4589  4590 -4591  1143 -4592 0
 4589  4590 -4591  1143 -4593 0
 4589  4590 -4591  1143 -4594 0

c  0-1 --> -1
c    (-b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧ -p_1143) -> ( b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0)
c  in CNF:
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨  b^{1, 1144}_2
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_1
c     b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨  b^{1, 1144}_0
c  in DIMACS:
 4589  4590  4591  1143  4592 0
 4589  4590  4591  1143 -4593 0
 4589  4590  4591  1143  4594 0

c  -1-1 --> -2
c    ( b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧ -p_1143) -> ( b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0)
c  in CNF:
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨  b^{1, 1144}_2
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨  b^{1, 1144}_1
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨  p_1143 ∨ -b^{1, 1144}_0
c  in DIMACS:
-4589  4590 -4591  1143  4592 0
-4589  4590 -4591  1143  4593 0
-4589  4590 -4591  1143 -4594 0

c  -2-1 --> break 
c    ( b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧ -p_1143) -> break
c  in CNF:
c    -b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨  p_1143 ∨ break
c  in DIMACS:
-4589 -4590  4591  1143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1143}_2 ∧ -b^{1, 1143}_1 ∧ -b^{1, 1143}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1143}_2 ∨  b^{1, 1143}_1 ∨  b^{1, 1143}_0 ∨ false 
c  in DIMACS:
-4589  4590  4591  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧ true) 
c  in CNF:
c     b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ false 
c  in DIMACS:
 4589 -4590 -4591  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1143}_2 ∧  b^{1, 1143}_1 ∧  b^{1, 1143}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1143}_2 ∨ -b^{1, 1143}_1 ∨ -b^{1, 1143}_0 ∨ false 
c  in DIMACS:
-4589 -4590 -4591  0

c i = 1144
c  -2+1 --> -1
c    ( b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧  p_1144) -> ( b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0)
c  in CNF:
c    -b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨  b^{1, 1145}_2
c    -b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_1
c    -b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨  b^{1, 1145}_0
c  in DIMACS:
-4592 -4593  4594 -1144  4595 0
-4592 -4593  4594 -1144 -4596 0
-4592 -4593  4594 -1144  4597 0

c  -1+1 --> 0
c    ( b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧  p_1144) -> (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧ -b^{1, 1145}_0)
c  in CNF:
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_2
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_1
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_0
c  in DIMACS:
-4592  4593 -4594 -1144 -4595 0
-4592  4593 -4594 -1144 -4596 0
-4592  4593 -4594 -1144 -4597 0

c  0+1 --> 1
c    (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧  p_1144) -> (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0)
c  in CNF:
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_2
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_1
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨  b^{1, 1145}_0
c  in DIMACS:
 4592  4593  4594 -1144 -4595 0
 4592  4593  4594 -1144 -4596 0
 4592  4593  4594 -1144  4597 0

c  1+1 --> 2
c    (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧  p_1144) -> (-b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0)
c  in CNF:
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_2
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨  b^{1, 1145}_1
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ -p_1144 ∨ -b^{1, 1145}_0
c  in DIMACS:
 4592  4593 -4594 -1144 -4595 0
 4592  4593 -4594 -1144  4596 0
 4592  4593 -4594 -1144 -4597 0

c  2+1 --> break 
c    (-b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 4592 -4593  4594 -1144 1162 0


c  2-1 --> 1
c    (-b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧ -p_1144) -> (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0)
c  in CNF:
c     b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_2
c     b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_1
c     b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨  b^{1, 1145}_0
c  in DIMACS:
 4592 -4593  4594  1144 -4595 0
 4592 -4593  4594  1144 -4596 0
 4592 -4593  4594  1144  4597 0

c  1-1 --> 0
c    (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧ -p_1144) -> (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧ -b^{1, 1145}_0)
c  in CNF:
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_2
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_1
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_0
c  in DIMACS:
 4592  4593 -4594  1144 -4595 0
 4592  4593 -4594  1144 -4596 0
 4592  4593 -4594  1144 -4597 0

c  0-1 --> -1
c    (-b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧ -p_1144) -> ( b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0)
c  in CNF:
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨  b^{1, 1145}_2
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_1
c     b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨  b^{1, 1145}_0
c  in DIMACS:
 4592  4593  4594  1144  4595 0
 4592  4593  4594  1144 -4596 0
 4592  4593  4594  1144  4597 0

c  -1-1 --> -2
c    ( b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧ -p_1144) -> ( b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0)
c  in CNF:
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨  b^{1, 1145}_2
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨  b^{1, 1145}_1
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨  p_1144 ∨ -b^{1, 1145}_0
c  in DIMACS:
-4592  4593 -4594  1144  4595 0
-4592  4593 -4594  1144  4596 0
-4592  4593 -4594  1144 -4597 0

c  -2-1 --> break 
c    ( b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-4592 -4593  4594  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1144}_2 ∧ -b^{1, 1144}_1 ∧ -b^{1, 1144}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1144}_2 ∨  b^{1, 1144}_1 ∨  b^{1, 1144}_0 ∨ false 
c  in DIMACS:
-4592  4593  4594  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧ true) 
c  in CNF:
c     b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ false 
c  in DIMACS:
 4592 -4593 -4594  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1144}_2 ∧  b^{1, 1144}_1 ∧  b^{1, 1144}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1144}_2 ∨ -b^{1, 1144}_1 ∨ -b^{1, 1144}_0 ∨ false 
c  in DIMACS:
-4592 -4593 -4594  0

c i = 1145
c  -2+1 --> -1
c    ( b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧  p_1145) -> ( b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0)
c  in CNF:
c    -b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨  b^{1, 1146}_2
c    -b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_1
c    -b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨  b^{1, 1146}_0
c  in DIMACS:
-4595 -4596  4597 -1145  4598 0
-4595 -4596  4597 -1145 -4599 0
-4595 -4596  4597 -1145  4600 0

c  -1+1 --> 0
c    ( b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧  p_1145) -> (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧ -b^{1, 1146}_0)
c  in CNF:
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_2
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_1
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_0
c  in DIMACS:
-4595  4596 -4597 -1145 -4598 0
-4595  4596 -4597 -1145 -4599 0
-4595  4596 -4597 -1145 -4600 0

c  0+1 --> 1
c    (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧  p_1145) -> (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0)
c  in CNF:
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_2
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_1
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨  b^{1, 1146}_0
c  in DIMACS:
 4595  4596  4597 -1145 -4598 0
 4595  4596  4597 -1145 -4599 0
 4595  4596  4597 -1145  4600 0

c  1+1 --> 2
c    (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧  p_1145) -> (-b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0)
c  in CNF:
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_2
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨  b^{1, 1146}_1
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ -p_1145 ∨ -b^{1, 1146}_0
c  in DIMACS:
 4595  4596 -4597 -1145 -4598 0
 4595  4596 -4597 -1145  4599 0
 4595  4596 -4597 -1145 -4600 0

c  2+1 --> break 
c    (-b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧  p_1145) -> break
c  in CNF:
c     b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ -p_1145 ∨ break
c  in DIMACS:
 4595 -4596  4597 -1145 1162 0


c  2-1 --> 1
c    (-b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧ -p_1145) -> (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0)
c  in CNF:
c     b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_2
c     b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_1
c     b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨  b^{1, 1146}_0
c  in DIMACS:
 4595 -4596  4597  1145 -4598 0
 4595 -4596  4597  1145 -4599 0
 4595 -4596  4597  1145  4600 0

c  1-1 --> 0
c    (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧ -p_1145) -> (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧ -b^{1, 1146}_0)
c  in CNF:
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_2
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_1
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_0
c  in DIMACS:
 4595  4596 -4597  1145 -4598 0
 4595  4596 -4597  1145 -4599 0
 4595  4596 -4597  1145 -4600 0

c  0-1 --> -1
c    (-b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧ -p_1145) -> ( b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0)
c  in CNF:
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨  b^{1, 1146}_2
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_1
c     b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨  b^{1, 1146}_0
c  in DIMACS:
 4595  4596  4597  1145  4598 0
 4595  4596  4597  1145 -4599 0
 4595  4596  4597  1145  4600 0

c  -1-1 --> -2
c    ( b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧ -p_1145) -> ( b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0)
c  in CNF:
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨  b^{1, 1146}_2
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨  b^{1, 1146}_1
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨  p_1145 ∨ -b^{1, 1146}_0
c  in DIMACS:
-4595  4596 -4597  1145  4598 0
-4595  4596 -4597  1145  4599 0
-4595  4596 -4597  1145 -4600 0

c  -2-1 --> break 
c    ( b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧ -p_1145) -> break
c  in CNF:
c    -b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨  p_1145 ∨ break
c  in DIMACS:
-4595 -4596  4597  1145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1145}_2 ∧ -b^{1, 1145}_1 ∧ -b^{1, 1145}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1145}_2 ∨  b^{1, 1145}_1 ∨  b^{1, 1145}_0 ∨ false 
c  in DIMACS:
-4595  4596  4597  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧ true) 
c  in CNF:
c     b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ false 
c  in DIMACS:
 4595 -4596 -4597  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1145}_2 ∧  b^{1, 1145}_1 ∧  b^{1, 1145}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1145}_2 ∨ -b^{1, 1145}_1 ∨ -b^{1, 1145}_0 ∨ false 
c  in DIMACS:
-4595 -4596 -4597  0

c i = 1146
c  -2+1 --> -1
c    ( b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧  p_1146) -> ( b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0)
c  in CNF:
c    -b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨  b^{1, 1147}_2
c    -b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_1
c    -b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨  b^{1, 1147}_0
c  in DIMACS:
-4598 -4599  4600 -1146  4601 0
-4598 -4599  4600 -1146 -4602 0
-4598 -4599  4600 -1146  4603 0

c  -1+1 --> 0
c    ( b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧  p_1146) -> (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧ -b^{1, 1147}_0)
c  in CNF:
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_2
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_1
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_0
c  in DIMACS:
-4598  4599 -4600 -1146 -4601 0
-4598  4599 -4600 -1146 -4602 0
-4598  4599 -4600 -1146 -4603 0

c  0+1 --> 1
c    (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧  p_1146) -> (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0)
c  in CNF:
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_2
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_1
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨  b^{1, 1147}_0
c  in DIMACS:
 4598  4599  4600 -1146 -4601 0
 4598  4599  4600 -1146 -4602 0
 4598  4599  4600 -1146  4603 0

c  1+1 --> 2
c    (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧  p_1146) -> (-b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0)
c  in CNF:
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_2
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨  b^{1, 1147}_1
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ -p_1146 ∨ -b^{1, 1147}_0
c  in DIMACS:
 4598  4599 -4600 -1146 -4601 0
 4598  4599 -4600 -1146  4602 0
 4598  4599 -4600 -1146 -4603 0

c  2+1 --> break 
c    (-b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 4598 -4599  4600 -1146 1162 0


c  2-1 --> 1
c    (-b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧ -p_1146) -> (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0)
c  in CNF:
c     b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_2
c     b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_1
c     b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨  b^{1, 1147}_0
c  in DIMACS:
 4598 -4599  4600  1146 -4601 0
 4598 -4599  4600  1146 -4602 0
 4598 -4599  4600  1146  4603 0

c  1-1 --> 0
c    (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧ -p_1146) -> (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧ -b^{1, 1147}_0)
c  in CNF:
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_2
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_1
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_0
c  in DIMACS:
 4598  4599 -4600  1146 -4601 0
 4598  4599 -4600  1146 -4602 0
 4598  4599 -4600  1146 -4603 0

c  0-1 --> -1
c    (-b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧ -p_1146) -> ( b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0)
c  in CNF:
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨  b^{1, 1147}_2
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_1
c     b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨  b^{1, 1147}_0
c  in DIMACS:
 4598  4599  4600  1146  4601 0
 4598  4599  4600  1146 -4602 0
 4598  4599  4600  1146  4603 0

c  -1-1 --> -2
c    ( b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧ -p_1146) -> ( b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0)
c  in CNF:
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨  b^{1, 1147}_2
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨  b^{1, 1147}_1
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨  p_1146 ∨ -b^{1, 1147}_0
c  in DIMACS:
-4598  4599 -4600  1146  4601 0
-4598  4599 -4600  1146  4602 0
-4598  4599 -4600  1146 -4603 0

c  -2-1 --> break 
c    ( b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-4598 -4599  4600  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1146}_2 ∧ -b^{1, 1146}_1 ∧ -b^{1, 1146}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1146}_2 ∨  b^{1, 1146}_1 ∨  b^{1, 1146}_0 ∨ false 
c  in DIMACS:
-4598  4599  4600  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧ true) 
c  in CNF:
c     b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ false 
c  in DIMACS:
 4598 -4599 -4600  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1146}_2 ∧  b^{1, 1146}_1 ∧  b^{1, 1146}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1146}_2 ∨ -b^{1, 1146}_1 ∨ -b^{1, 1146}_0 ∨ false 
c  in DIMACS:
-4598 -4599 -4600  0

c i = 1147
c  -2+1 --> -1
c    ( b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧  p_1147) -> ( b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0)
c  in CNF:
c    -b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨  b^{1, 1148}_2
c    -b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_1
c    -b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨  b^{1, 1148}_0
c  in DIMACS:
-4601 -4602  4603 -1147  4604 0
-4601 -4602  4603 -1147 -4605 0
-4601 -4602  4603 -1147  4606 0

c  -1+1 --> 0
c    ( b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧  p_1147) -> (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧ -b^{1, 1148}_0)
c  in CNF:
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_2
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_1
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_0
c  in DIMACS:
-4601  4602 -4603 -1147 -4604 0
-4601  4602 -4603 -1147 -4605 0
-4601  4602 -4603 -1147 -4606 0

c  0+1 --> 1
c    (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧  p_1147) -> (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0)
c  in CNF:
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_2
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_1
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨  b^{1, 1148}_0
c  in DIMACS:
 4601  4602  4603 -1147 -4604 0
 4601  4602  4603 -1147 -4605 0
 4601  4602  4603 -1147  4606 0

c  1+1 --> 2
c    (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧  p_1147) -> (-b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0)
c  in CNF:
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_2
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨  b^{1, 1148}_1
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ -p_1147 ∨ -b^{1, 1148}_0
c  in DIMACS:
 4601  4602 -4603 -1147 -4604 0
 4601  4602 -4603 -1147  4605 0
 4601  4602 -4603 -1147 -4606 0

c  2+1 --> break 
c    (-b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧  p_1147) -> break
c  in CNF:
c     b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ -p_1147 ∨ break
c  in DIMACS:
 4601 -4602  4603 -1147 1162 0


c  2-1 --> 1
c    (-b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧ -p_1147) -> (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0)
c  in CNF:
c     b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_2
c     b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_1
c     b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨  b^{1, 1148}_0
c  in DIMACS:
 4601 -4602  4603  1147 -4604 0
 4601 -4602  4603  1147 -4605 0
 4601 -4602  4603  1147  4606 0

c  1-1 --> 0
c    (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧ -p_1147) -> (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧ -b^{1, 1148}_0)
c  in CNF:
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_2
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_1
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_0
c  in DIMACS:
 4601  4602 -4603  1147 -4604 0
 4601  4602 -4603  1147 -4605 0
 4601  4602 -4603  1147 -4606 0

c  0-1 --> -1
c    (-b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧ -p_1147) -> ( b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0)
c  in CNF:
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨  b^{1, 1148}_2
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_1
c     b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨  b^{1, 1148}_0
c  in DIMACS:
 4601  4602  4603  1147  4604 0
 4601  4602  4603  1147 -4605 0
 4601  4602  4603  1147  4606 0

c  -1-1 --> -2
c    ( b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧ -p_1147) -> ( b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0)
c  in CNF:
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨  b^{1, 1148}_2
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨  b^{1, 1148}_1
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨  p_1147 ∨ -b^{1, 1148}_0
c  in DIMACS:
-4601  4602 -4603  1147  4604 0
-4601  4602 -4603  1147  4605 0
-4601  4602 -4603  1147 -4606 0

c  -2-1 --> break 
c    ( b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧ -p_1147) -> break
c  in CNF:
c    -b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨  p_1147 ∨ break
c  in DIMACS:
-4601 -4602  4603  1147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1147}_2 ∧ -b^{1, 1147}_1 ∧ -b^{1, 1147}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1147}_2 ∨  b^{1, 1147}_1 ∨  b^{1, 1147}_0 ∨ false 
c  in DIMACS:
-4601  4602  4603  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧ true) 
c  in CNF:
c     b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ false 
c  in DIMACS:
 4601 -4602 -4603  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1147}_2 ∧  b^{1, 1147}_1 ∧  b^{1, 1147}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1147}_2 ∨ -b^{1, 1147}_1 ∨ -b^{1, 1147}_0 ∨ false 
c  in DIMACS:
-4601 -4602 -4603  0

c i = 1148
c  -2+1 --> -1
c    ( b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧  p_1148) -> ( b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0)
c  in CNF:
c    -b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨  b^{1, 1149}_2
c    -b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_1
c    -b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨  b^{1, 1149}_0
c  in DIMACS:
-4604 -4605  4606 -1148  4607 0
-4604 -4605  4606 -1148 -4608 0
-4604 -4605  4606 -1148  4609 0

c  -1+1 --> 0
c    ( b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧  p_1148) -> (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧ -b^{1, 1149}_0)
c  in CNF:
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_2
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_1
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_0
c  in DIMACS:
-4604  4605 -4606 -1148 -4607 0
-4604  4605 -4606 -1148 -4608 0
-4604  4605 -4606 -1148 -4609 0

c  0+1 --> 1
c    (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧  p_1148) -> (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0)
c  in CNF:
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_2
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_1
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨  b^{1, 1149}_0
c  in DIMACS:
 4604  4605  4606 -1148 -4607 0
 4604  4605  4606 -1148 -4608 0
 4604  4605  4606 -1148  4609 0

c  1+1 --> 2
c    (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧  p_1148) -> (-b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0)
c  in CNF:
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_2
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨  b^{1, 1149}_1
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ -p_1148 ∨ -b^{1, 1149}_0
c  in DIMACS:
 4604  4605 -4606 -1148 -4607 0
 4604  4605 -4606 -1148  4608 0
 4604  4605 -4606 -1148 -4609 0

c  2+1 --> break 
c    (-b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 4604 -4605  4606 -1148 1162 0


c  2-1 --> 1
c    (-b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧ -p_1148) -> (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0)
c  in CNF:
c     b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_2
c     b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_1
c     b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨  b^{1, 1149}_0
c  in DIMACS:
 4604 -4605  4606  1148 -4607 0
 4604 -4605  4606  1148 -4608 0
 4604 -4605  4606  1148  4609 0

c  1-1 --> 0
c    (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧ -p_1148) -> (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧ -b^{1, 1149}_0)
c  in CNF:
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_2
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_1
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_0
c  in DIMACS:
 4604  4605 -4606  1148 -4607 0
 4604  4605 -4606  1148 -4608 0
 4604  4605 -4606  1148 -4609 0

c  0-1 --> -1
c    (-b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧ -p_1148) -> ( b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0)
c  in CNF:
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨  b^{1, 1149}_2
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_1
c     b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨  b^{1, 1149}_0
c  in DIMACS:
 4604  4605  4606  1148  4607 0
 4604  4605  4606  1148 -4608 0
 4604  4605  4606  1148  4609 0

c  -1-1 --> -2
c    ( b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧ -p_1148) -> ( b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0)
c  in CNF:
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨  b^{1, 1149}_2
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨  b^{1, 1149}_1
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨  p_1148 ∨ -b^{1, 1149}_0
c  in DIMACS:
-4604  4605 -4606  1148  4607 0
-4604  4605 -4606  1148  4608 0
-4604  4605 -4606  1148 -4609 0

c  -2-1 --> break 
c    ( b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-4604 -4605  4606  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1148}_2 ∧ -b^{1, 1148}_1 ∧ -b^{1, 1148}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1148}_2 ∨  b^{1, 1148}_1 ∨  b^{1, 1148}_0 ∨ false 
c  in DIMACS:
-4604  4605  4606  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧ true) 
c  in CNF:
c     b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ false 
c  in DIMACS:
 4604 -4605 -4606  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1148}_2 ∧  b^{1, 1148}_1 ∧  b^{1, 1148}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1148}_2 ∨ -b^{1, 1148}_1 ∨ -b^{1, 1148}_0 ∨ false 
c  in DIMACS:
-4604 -4605 -4606  0

c i = 1149
c  -2+1 --> -1
c    ( b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧  p_1149) -> ( b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0)
c  in CNF:
c    -b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨  b^{1, 1150}_2
c    -b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_1
c    -b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨  b^{1, 1150}_0
c  in DIMACS:
-4607 -4608  4609 -1149  4610 0
-4607 -4608  4609 -1149 -4611 0
-4607 -4608  4609 -1149  4612 0

c  -1+1 --> 0
c    ( b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧  p_1149) -> (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧ -b^{1, 1150}_0)
c  in CNF:
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_2
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_1
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_0
c  in DIMACS:
-4607  4608 -4609 -1149 -4610 0
-4607  4608 -4609 -1149 -4611 0
-4607  4608 -4609 -1149 -4612 0

c  0+1 --> 1
c    (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧  p_1149) -> (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0)
c  in CNF:
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_2
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_1
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨  b^{1, 1150}_0
c  in DIMACS:
 4607  4608  4609 -1149 -4610 0
 4607  4608  4609 -1149 -4611 0
 4607  4608  4609 -1149  4612 0

c  1+1 --> 2
c    (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧  p_1149) -> (-b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0)
c  in CNF:
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_2
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨  b^{1, 1150}_1
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ -p_1149 ∨ -b^{1, 1150}_0
c  in DIMACS:
 4607  4608 -4609 -1149 -4610 0
 4607  4608 -4609 -1149  4611 0
 4607  4608 -4609 -1149 -4612 0

c  2+1 --> break 
c    (-b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧  p_1149) -> break
c  in CNF:
c     b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ -p_1149 ∨ break
c  in DIMACS:
 4607 -4608  4609 -1149 1162 0


c  2-1 --> 1
c    (-b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧ -p_1149) -> (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0)
c  in CNF:
c     b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_2
c     b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_1
c     b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨  b^{1, 1150}_0
c  in DIMACS:
 4607 -4608  4609  1149 -4610 0
 4607 -4608  4609  1149 -4611 0
 4607 -4608  4609  1149  4612 0

c  1-1 --> 0
c    (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧ -p_1149) -> (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧ -b^{1, 1150}_0)
c  in CNF:
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_2
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_1
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_0
c  in DIMACS:
 4607  4608 -4609  1149 -4610 0
 4607  4608 -4609  1149 -4611 0
 4607  4608 -4609  1149 -4612 0

c  0-1 --> -1
c    (-b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧ -p_1149) -> ( b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0)
c  in CNF:
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨  b^{1, 1150}_2
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_1
c     b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨  b^{1, 1150}_0
c  in DIMACS:
 4607  4608  4609  1149  4610 0
 4607  4608  4609  1149 -4611 0
 4607  4608  4609  1149  4612 0

c  -1-1 --> -2
c    ( b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧ -p_1149) -> ( b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0)
c  in CNF:
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨  b^{1, 1150}_2
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨  b^{1, 1150}_1
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨  p_1149 ∨ -b^{1, 1150}_0
c  in DIMACS:
-4607  4608 -4609  1149  4610 0
-4607  4608 -4609  1149  4611 0
-4607  4608 -4609  1149 -4612 0

c  -2-1 --> break 
c    ( b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧ -p_1149) -> break
c  in CNF:
c    -b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨  p_1149 ∨ break
c  in DIMACS:
-4607 -4608  4609  1149 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1149}_2 ∧ -b^{1, 1149}_1 ∧ -b^{1, 1149}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1149}_2 ∨  b^{1, 1149}_1 ∨  b^{1, 1149}_0 ∨ false 
c  in DIMACS:
-4607  4608  4609  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧ true) 
c  in CNF:
c     b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ false 
c  in DIMACS:
 4607 -4608 -4609  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1149}_2 ∧  b^{1, 1149}_1 ∧  b^{1, 1149}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1149}_2 ∨ -b^{1, 1149}_1 ∨ -b^{1, 1149}_0 ∨ false 
c  in DIMACS:
-4607 -4608 -4609  0

c i = 1150
c  -2+1 --> -1
c    ( b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧  p_1150) -> ( b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0)
c  in CNF:
c    -b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨  b^{1, 1151}_2
c    -b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_1
c    -b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨  b^{1, 1151}_0
c  in DIMACS:
-4610 -4611  4612 -1150  4613 0
-4610 -4611  4612 -1150 -4614 0
-4610 -4611  4612 -1150  4615 0

c  -1+1 --> 0
c    ( b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧  p_1150) -> (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧ -b^{1, 1151}_0)
c  in CNF:
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_2
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_1
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_0
c  in DIMACS:
-4610  4611 -4612 -1150 -4613 0
-4610  4611 -4612 -1150 -4614 0
-4610  4611 -4612 -1150 -4615 0

c  0+1 --> 1
c    (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧  p_1150) -> (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0)
c  in CNF:
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_2
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_1
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨  b^{1, 1151}_0
c  in DIMACS:
 4610  4611  4612 -1150 -4613 0
 4610  4611  4612 -1150 -4614 0
 4610  4611  4612 -1150  4615 0

c  1+1 --> 2
c    (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧  p_1150) -> (-b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0)
c  in CNF:
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_2
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨  b^{1, 1151}_1
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ -p_1150 ∨ -b^{1, 1151}_0
c  in DIMACS:
 4610  4611 -4612 -1150 -4613 0
 4610  4611 -4612 -1150  4614 0
 4610  4611 -4612 -1150 -4615 0

c  2+1 --> break 
c    (-b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 4610 -4611  4612 -1150 1162 0


c  2-1 --> 1
c    (-b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧ -p_1150) -> (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0)
c  in CNF:
c     b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_2
c     b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_1
c     b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨  b^{1, 1151}_0
c  in DIMACS:
 4610 -4611  4612  1150 -4613 0
 4610 -4611  4612  1150 -4614 0
 4610 -4611  4612  1150  4615 0

c  1-1 --> 0
c    (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧ -p_1150) -> (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧ -b^{1, 1151}_0)
c  in CNF:
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_2
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_1
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_0
c  in DIMACS:
 4610  4611 -4612  1150 -4613 0
 4610  4611 -4612  1150 -4614 0
 4610  4611 -4612  1150 -4615 0

c  0-1 --> -1
c    (-b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧ -p_1150) -> ( b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0)
c  in CNF:
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨  b^{1, 1151}_2
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_1
c     b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨  b^{1, 1151}_0
c  in DIMACS:
 4610  4611  4612  1150  4613 0
 4610  4611  4612  1150 -4614 0
 4610  4611  4612  1150  4615 0

c  -1-1 --> -2
c    ( b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧ -p_1150) -> ( b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0)
c  in CNF:
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨  b^{1, 1151}_2
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨  b^{1, 1151}_1
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨  p_1150 ∨ -b^{1, 1151}_0
c  in DIMACS:
-4610  4611 -4612  1150  4613 0
-4610  4611 -4612  1150  4614 0
-4610  4611 -4612  1150 -4615 0

c  -2-1 --> break 
c    ( b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-4610 -4611  4612  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1150}_2 ∧ -b^{1, 1150}_1 ∧ -b^{1, 1150}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1150}_2 ∨  b^{1, 1150}_1 ∨  b^{1, 1150}_0 ∨ false 
c  in DIMACS:
-4610  4611  4612  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧ true) 
c  in CNF:
c     b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ false 
c  in DIMACS:
 4610 -4611 -4612  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1150}_2 ∧  b^{1, 1150}_1 ∧  b^{1, 1150}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1150}_2 ∨ -b^{1, 1150}_1 ∨ -b^{1, 1150}_0 ∨ false 
c  in DIMACS:
-4610 -4611 -4612  0

c i = 1151
c  -2+1 --> -1
c    ( b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧  p_1151) -> ( b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0)
c  in CNF:
c    -b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨  b^{1, 1152}_2
c    -b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_1
c    -b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨  b^{1, 1152}_0
c  in DIMACS:
-4613 -4614  4615 -1151  4616 0
-4613 -4614  4615 -1151 -4617 0
-4613 -4614  4615 -1151  4618 0

c  -1+1 --> 0
c    ( b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧  p_1151) -> (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧ -b^{1, 1152}_0)
c  in CNF:
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_2
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_1
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_0
c  in DIMACS:
-4613  4614 -4615 -1151 -4616 0
-4613  4614 -4615 -1151 -4617 0
-4613  4614 -4615 -1151 -4618 0

c  0+1 --> 1
c    (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧  p_1151) -> (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0)
c  in CNF:
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_2
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_1
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨  b^{1, 1152}_0
c  in DIMACS:
 4613  4614  4615 -1151 -4616 0
 4613  4614  4615 -1151 -4617 0
 4613  4614  4615 -1151  4618 0

c  1+1 --> 2
c    (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧  p_1151) -> (-b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0)
c  in CNF:
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_2
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨  b^{1, 1152}_1
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ -p_1151 ∨ -b^{1, 1152}_0
c  in DIMACS:
 4613  4614 -4615 -1151 -4616 0
 4613  4614 -4615 -1151  4617 0
 4613  4614 -4615 -1151 -4618 0

c  2+1 --> break 
c    (-b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧  p_1151) -> break
c  in CNF:
c     b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ -p_1151 ∨ break
c  in DIMACS:
 4613 -4614  4615 -1151 1162 0


c  2-1 --> 1
c    (-b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧ -p_1151) -> (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0)
c  in CNF:
c     b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_2
c     b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_1
c     b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨  b^{1, 1152}_0
c  in DIMACS:
 4613 -4614  4615  1151 -4616 0
 4613 -4614  4615  1151 -4617 0
 4613 -4614  4615  1151  4618 0

c  1-1 --> 0
c    (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧ -p_1151) -> (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧ -b^{1, 1152}_0)
c  in CNF:
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_2
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_1
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_0
c  in DIMACS:
 4613  4614 -4615  1151 -4616 0
 4613  4614 -4615  1151 -4617 0
 4613  4614 -4615  1151 -4618 0

c  0-1 --> -1
c    (-b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧ -p_1151) -> ( b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0)
c  in CNF:
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨  b^{1, 1152}_2
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_1
c     b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨  b^{1, 1152}_0
c  in DIMACS:
 4613  4614  4615  1151  4616 0
 4613  4614  4615  1151 -4617 0
 4613  4614  4615  1151  4618 0

c  -1-1 --> -2
c    ( b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧ -p_1151) -> ( b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0)
c  in CNF:
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨  b^{1, 1152}_2
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨  b^{1, 1152}_1
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨  p_1151 ∨ -b^{1, 1152}_0
c  in DIMACS:
-4613  4614 -4615  1151  4616 0
-4613  4614 -4615  1151  4617 0
-4613  4614 -4615  1151 -4618 0

c  -2-1 --> break 
c    ( b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧ -p_1151) -> break
c  in CNF:
c    -b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨  p_1151 ∨ break
c  in DIMACS:
-4613 -4614  4615  1151 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1151}_2 ∧ -b^{1, 1151}_1 ∧ -b^{1, 1151}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1151}_2 ∨  b^{1, 1151}_1 ∨  b^{1, 1151}_0 ∨ false 
c  in DIMACS:
-4613  4614  4615  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧ true) 
c  in CNF:
c     b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ false 
c  in DIMACS:
 4613 -4614 -4615  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1151}_2 ∧  b^{1, 1151}_1 ∧  b^{1, 1151}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1151}_2 ∨ -b^{1, 1151}_1 ∨ -b^{1, 1151}_0 ∨ false 
c  in DIMACS:
-4613 -4614 -4615  0

c i = 1152
c  -2+1 --> -1
c    ( b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧  p_1152) -> ( b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0)
c  in CNF:
c    -b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨  b^{1, 1153}_2
c    -b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_1
c    -b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨  b^{1, 1153}_0
c  in DIMACS:
-4616 -4617  4618 -1152  4619 0
-4616 -4617  4618 -1152 -4620 0
-4616 -4617  4618 -1152  4621 0

c  -1+1 --> 0
c    ( b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧  p_1152) -> (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧ -b^{1, 1153}_0)
c  in CNF:
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_2
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_1
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_0
c  in DIMACS:
-4616  4617 -4618 -1152 -4619 0
-4616  4617 -4618 -1152 -4620 0
-4616  4617 -4618 -1152 -4621 0

c  0+1 --> 1
c    (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧  p_1152) -> (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0)
c  in CNF:
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_2
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_1
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨  b^{1, 1153}_0
c  in DIMACS:
 4616  4617  4618 -1152 -4619 0
 4616  4617  4618 -1152 -4620 0
 4616  4617  4618 -1152  4621 0

c  1+1 --> 2
c    (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧  p_1152) -> (-b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0)
c  in CNF:
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_2
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨  b^{1, 1153}_1
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ -p_1152 ∨ -b^{1, 1153}_0
c  in DIMACS:
 4616  4617 -4618 -1152 -4619 0
 4616  4617 -4618 -1152  4620 0
 4616  4617 -4618 -1152 -4621 0

c  2+1 --> break 
c    (-b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 4616 -4617  4618 -1152 1162 0


c  2-1 --> 1
c    (-b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧ -p_1152) -> (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0)
c  in CNF:
c     b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_2
c     b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_1
c     b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨  b^{1, 1153}_0
c  in DIMACS:
 4616 -4617  4618  1152 -4619 0
 4616 -4617  4618  1152 -4620 0
 4616 -4617  4618  1152  4621 0

c  1-1 --> 0
c    (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧ -p_1152) -> (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧ -b^{1, 1153}_0)
c  in CNF:
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_2
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_1
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_0
c  in DIMACS:
 4616  4617 -4618  1152 -4619 0
 4616  4617 -4618  1152 -4620 0
 4616  4617 -4618  1152 -4621 0

c  0-1 --> -1
c    (-b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧ -p_1152) -> ( b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0)
c  in CNF:
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨  b^{1, 1153}_2
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_1
c     b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨  b^{1, 1153}_0
c  in DIMACS:
 4616  4617  4618  1152  4619 0
 4616  4617  4618  1152 -4620 0
 4616  4617  4618  1152  4621 0

c  -1-1 --> -2
c    ( b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧ -p_1152) -> ( b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0)
c  in CNF:
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨  b^{1, 1153}_2
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨  b^{1, 1153}_1
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨  p_1152 ∨ -b^{1, 1153}_0
c  in DIMACS:
-4616  4617 -4618  1152  4619 0
-4616  4617 -4618  1152  4620 0
-4616  4617 -4618  1152 -4621 0

c  -2-1 --> break 
c    ( b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-4616 -4617  4618  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1152}_2 ∧ -b^{1, 1152}_1 ∧ -b^{1, 1152}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1152}_2 ∨  b^{1, 1152}_1 ∨  b^{1, 1152}_0 ∨ false 
c  in DIMACS:
-4616  4617  4618  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧ true) 
c  in CNF:
c     b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ false 
c  in DIMACS:
 4616 -4617 -4618  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1152}_2 ∧  b^{1, 1152}_1 ∧  b^{1, 1152}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1152}_2 ∨ -b^{1, 1152}_1 ∨ -b^{1, 1152}_0 ∨ false 
c  in DIMACS:
-4616 -4617 -4618  0

c i = 1153
c  -2+1 --> -1
c    ( b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧  p_1153) -> ( b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0)
c  in CNF:
c    -b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨  b^{1, 1154}_2
c    -b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_1
c    -b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨  b^{1, 1154}_0
c  in DIMACS:
-4619 -4620  4621 -1153  4622 0
-4619 -4620  4621 -1153 -4623 0
-4619 -4620  4621 -1153  4624 0

c  -1+1 --> 0
c    ( b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧  p_1153) -> (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧ -b^{1, 1154}_0)
c  in CNF:
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_2
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_1
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_0
c  in DIMACS:
-4619  4620 -4621 -1153 -4622 0
-4619  4620 -4621 -1153 -4623 0
-4619  4620 -4621 -1153 -4624 0

c  0+1 --> 1
c    (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧  p_1153) -> (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0)
c  in CNF:
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_2
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_1
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨  b^{1, 1154}_0
c  in DIMACS:
 4619  4620  4621 -1153 -4622 0
 4619  4620  4621 -1153 -4623 0
 4619  4620  4621 -1153  4624 0

c  1+1 --> 2
c    (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧  p_1153) -> (-b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0)
c  in CNF:
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_2
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨  b^{1, 1154}_1
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ -p_1153 ∨ -b^{1, 1154}_0
c  in DIMACS:
 4619  4620 -4621 -1153 -4622 0
 4619  4620 -4621 -1153  4623 0
 4619  4620 -4621 -1153 -4624 0

c  2+1 --> break 
c    (-b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧  p_1153) -> break
c  in CNF:
c     b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ -p_1153 ∨ break
c  in DIMACS:
 4619 -4620  4621 -1153 1162 0


c  2-1 --> 1
c    (-b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧ -p_1153) -> (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0)
c  in CNF:
c     b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_2
c     b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_1
c     b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨  b^{1, 1154}_0
c  in DIMACS:
 4619 -4620  4621  1153 -4622 0
 4619 -4620  4621  1153 -4623 0
 4619 -4620  4621  1153  4624 0

c  1-1 --> 0
c    (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧ -p_1153) -> (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧ -b^{1, 1154}_0)
c  in CNF:
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_2
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_1
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_0
c  in DIMACS:
 4619  4620 -4621  1153 -4622 0
 4619  4620 -4621  1153 -4623 0
 4619  4620 -4621  1153 -4624 0

c  0-1 --> -1
c    (-b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧ -p_1153) -> ( b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0)
c  in CNF:
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨  b^{1, 1154}_2
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_1
c     b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨  b^{1, 1154}_0
c  in DIMACS:
 4619  4620  4621  1153  4622 0
 4619  4620  4621  1153 -4623 0
 4619  4620  4621  1153  4624 0

c  -1-1 --> -2
c    ( b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧ -p_1153) -> ( b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0)
c  in CNF:
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨  b^{1, 1154}_2
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨  b^{1, 1154}_1
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨  p_1153 ∨ -b^{1, 1154}_0
c  in DIMACS:
-4619  4620 -4621  1153  4622 0
-4619  4620 -4621  1153  4623 0
-4619  4620 -4621  1153 -4624 0

c  -2-1 --> break 
c    ( b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧ -p_1153) -> break
c  in CNF:
c    -b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨  p_1153 ∨ break
c  in DIMACS:
-4619 -4620  4621  1153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1153}_2 ∧ -b^{1, 1153}_1 ∧ -b^{1, 1153}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1153}_2 ∨  b^{1, 1153}_1 ∨  b^{1, 1153}_0 ∨ false 
c  in DIMACS:
-4619  4620  4621  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧ true) 
c  in CNF:
c     b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ false 
c  in DIMACS:
 4619 -4620 -4621  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1153}_2 ∧  b^{1, 1153}_1 ∧  b^{1, 1153}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1153}_2 ∨ -b^{1, 1153}_1 ∨ -b^{1, 1153}_0 ∨ false 
c  in DIMACS:
-4619 -4620 -4621  0

c i = 1154
c  -2+1 --> -1
c    ( b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧  p_1154) -> ( b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0)
c  in CNF:
c    -b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨  b^{1, 1155}_2
c    -b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_1
c    -b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨  b^{1, 1155}_0
c  in DIMACS:
-4622 -4623  4624 -1154  4625 0
-4622 -4623  4624 -1154 -4626 0
-4622 -4623  4624 -1154  4627 0

c  -1+1 --> 0
c    ( b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧  p_1154) -> (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧ -b^{1, 1155}_0)
c  in CNF:
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_2
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_1
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_0
c  in DIMACS:
-4622  4623 -4624 -1154 -4625 0
-4622  4623 -4624 -1154 -4626 0
-4622  4623 -4624 -1154 -4627 0

c  0+1 --> 1
c    (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧  p_1154) -> (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0)
c  in CNF:
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_2
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_1
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨  b^{1, 1155}_0
c  in DIMACS:
 4622  4623  4624 -1154 -4625 0
 4622  4623  4624 -1154 -4626 0
 4622  4623  4624 -1154  4627 0

c  1+1 --> 2
c    (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧  p_1154) -> (-b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0)
c  in CNF:
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_2
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨  b^{1, 1155}_1
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ -p_1154 ∨ -b^{1, 1155}_0
c  in DIMACS:
 4622  4623 -4624 -1154 -4625 0
 4622  4623 -4624 -1154  4626 0
 4622  4623 -4624 -1154 -4627 0

c  2+1 --> break 
c    (-b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧  p_1154) -> break
c  in CNF:
c     b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ -p_1154 ∨ break
c  in DIMACS:
 4622 -4623  4624 -1154 1162 0


c  2-1 --> 1
c    (-b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧ -p_1154) -> (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0)
c  in CNF:
c     b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_2
c     b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_1
c     b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨  b^{1, 1155}_0
c  in DIMACS:
 4622 -4623  4624  1154 -4625 0
 4622 -4623  4624  1154 -4626 0
 4622 -4623  4624  1154  4627 0

c  1-1 --> 0
c    (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧ -p_1154) -> (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧ -b^{1, 1155}_0)
c  in CNF:
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_2
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_1
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_0
c  in DIMACS:
 4622  4623 -4624  1154 -4625 0
 4622  4623 -4624  1154 -4626 0
 4622  4623 -4624  1154 -4627 0

c  0-1 --> -1
c    (-b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧ -p_1154) -> ( b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0)
c  in CNF:
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨  b^{1, 1155}_2
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_1
c     b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨  b^{1, 1155}_0
c  in DIMACS:
 4622  4623  4624  1154  4625 0
 4622  4623  4624  1154 -4626 0
 4622  4623  4624  1154  4627 0

c  -1-1 --> -2
c    ( b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧ -p_1154) -> ( b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0)
c  in CNF:
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨  b^{1, 1155}_2
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨  b^{1, 1155}_1
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨  p_1154 ∨ -b^{1, 1155}_0
c  in DIMACS:
-4622  4623 -4624  1154  4625 0
-4622  4623 -4624  1154  4626 0
-4622  4623 -4624  1154 -4627 0

c  -2-1 --> break 
c    ( b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧ -p_1154) -> break
c  in CNF:
c    -b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨  p_1154 ∨ break
c  in DIMACS:
-4622 -4623  4624  1154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1154}_2 ∧ -b^{1, 1154}_1 ∧ -b^{1, 1154}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1154}_2 ∨  b^{1, 1154}_1 ∨  b^{1, 1154}_0 ∨ false 
c  in DIMACS:
-4622  4623  4624  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧ true) 
c  in CNF:
c     b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ false 
c  in DIMACS:
 4622 -4623 -4624  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1154}_2 ∧  b^{1, 1154}_1 ∧  b^{1, 1154}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1154}_2 ∨ -b^{1, 1154}_1 ∨ -b^{1, 1154}_0 ∨ false 
c  in DIMACS:
-4622 -4623 -4624  0

c i = 1155
c  -2+1 --> -1
c    ( b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧  p_1155) -> ( b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0)
c  in CNF:
c    -b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨  b^{1, 1156}_2
c    -b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_1
c    -b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨  b^{1, 1156}_0
c  in DIMACS:
-4625 -4626  4627 -1155  4628 0
-4625 -4626  4627 -1155 -4629 0
-4625 -4626  4627 -1155  4630 0

c  -1+1 --> 0
c    ( b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧  p_1155) -> (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧ -b^{1, 1156}_0)
c  in CNF:
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_2
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_1
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_0
c  in DIMACS:
-4625  4626 -4627 -1155 -4628 0
-4625  4626 -4627 -1155 -4629 0
-4625  4626 -4627 -1155 -4630 0

c  0+1 --> 1
c    (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧  p_1155) -> (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0)
c  in CNF:
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_2
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_1
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨  b^{1, 1156}_0
c  in DIMACS:
 4625  4626  4627 -1155 -4628 0
 4625  4626  4627 -1155 -4629 0
 4625  4626  4627 -1155  4630 0

c  1+1 --> 2
c    (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧  p_1155) -> (-b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0)
c  in CNF:
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_2
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨  b^{1, 1156}_1
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ -p_1155 ∨ -b^{1, 1156}_0
c  in DIMACS:
 4625  4626 -4627 -1155 -4628 0
 4625  4626 -4627 -1155  4629 0
 4625  4626 -4627 -1155 -4630 0

c  2+1 --> break 
c    (-b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 4625 -4626  4627 -1155 1162 0


c  2-1 --> 1
c    (-b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧ -p_1155) -> (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0)
c  in CNF:
c     b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_2
c     b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_1
c     b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨  b^{1, 1156}_0
c  in DIMACS:
 4625 -4626  4627  1155 -4628 0
 4625 -4626  4627  1155 -4629 0
 4625 -4626  4627  1155  4630 0

c  1-1 --> 0
c    (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧ -p_1155) -> (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧ -b^{1, 1156}_0)
c  in CNF:
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_2
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_1
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_0
c  in DIMACS:
 4625  4626 -4627  1155 -4628 0
 4625  4626 -4627  1155 -4629 0
 4625  4626 -4627  1155 -4630 0

c  0-1 --> -1
c    (-b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧ -p_1155) -> ( b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0)
c  in CNF:
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨  b^{1, 1156}_2
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_1
c     b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨  b^{1, 1156}_0
c  in DIMACS:
 4625  4626  4627  1155  4628 0
 4625  4626  4627  1155 -4629 0
 4625  4626  4627  1155  4630 0

c  -1-1 --> -2
c    ( b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧ -p_1155) -> ( b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0)
c  in CNF:
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨  b^{1, 1156}_2
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨  b^{1, 1156}_1
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨  p_1155 ∨ -b^{1, 1156}_0
c  in DIMACS:
-4625  4626 -4627  1155  4628 0
-4625  4626 -4627  1155  4629 0
-4625  4626 -4627  1155 -4630 0

c  -2-1 --> break 
c    ( b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-4625 -4626  4627  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1155}_2 ∧ -b^{1, 1155}_1 ∧ -b^{1, 1155}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1155}_2 ∨  b^{1, 1155}_1 ∨  b^{1, 1155}_0 ∨ false 
c  in DIMACS:
-4625  4626  4627  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧ true) 
c  in CNF:
c     b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ false 
c  in DIMACS:
 4625 -4626 -4627  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1155}_2 ∧  b^{1, 1155}_1 ∧  b^{1, 1155}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1155}_2 ∨ -b^{1, 1155}_1 ∨ -b^{1, 1155}_0 ∨ false 
c  in DIMACS:
-4625 -4626 -4627  0

c i = 1156
c  -2+1 --> -1
c    ( b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧  p_1156) -> ( b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0)
c  in CNF:
c    -b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨  b^{1, 1157}_2
c    -b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_1
c    -b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨  b^{1, 1157}_0
c  in DIMACS:
-4628 -4629  4630 -1156  4631 0
-4628 -4629  4630 -1156 -4632 0
-4628 -4629  4630 -1156  4633 0

c  -1+1 --> 0
c    ( b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧  p_1156) -> (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧ -b^{1, 1157}_0)
c  in CNF:
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_2
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_1
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_0
c  in DIMACS:
-4628  4629 -4630 -1156 -4631 0
-4628  4629 -4630 -1156 -4632 0
-4628  4629 -4630 -1156 -4633 0

c  0+1 --> 1
c    (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧  p_1156) -> (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0)
c  in CNF:
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_2
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_1
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨  b^{1, 1157}_0
c  in DIMACS:
 4628  4629  4630 -1156 -4631 0
 4628  4629  4630 -1156 -4632 0
 4628  4629  4630 -1156  4633 0

c  1+1 --> 2
c    (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧  p_1156) -> (-b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0)
c  in CNF:
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_2
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨  b^{1, 1157}_1
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ -p_1156 ∨ -b^{1, 1157}_0
c  in DIMACS:
 4628  4629 -4630 -1156 -4631 0
 4628  4629 -4630 -1156  4632 0
 4628  4629 -4630 -1156 -4633 0

c  2+1 --> break 
c    (-b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 4628 -4629  4630 -1156 1162 0


c  2-1 --> 1
c    (-b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧ -p_1156) -> (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0)
c  in CNF:
c     b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_2
c     b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_1
c     b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨  b^{1, 1157}_0
c  in DIMACS:
 4628 -4629  4630  1156 -4631 0
 4628 -4629  4630  1156 -4632 0
 4628 -4629  4630  1156  4633 0

c  1-1 --> 0
c    (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧ -p_1156) -> (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧ -b^{1, 1157}_0)
c  in CNF:
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_2
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_1
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_0
c  in DIMACS:
 4628  4629 -4630  1156 -4631 0
 4628  4629 -4630  1156 -4632 0
 4628  4629 -4630  1156 -4633 0

c  0-1 --> -1
c    (-b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧ -p_1156) -> ( b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0)
c  in CNF:
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨  b^{1, 1157}_2
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_1
c     b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨  b^{1, 1157}_0
c  in DIMACS:
 4628  4629  4630  1156  4631 0
 4628  4629  4630  1156 -4632 0
 4628  4629  4630  1156  4633 0

c  -1-1 --> -2
c    ( b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧ -p_1156) -> ( b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0)
c  in CNF:
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨  b^{1, 1157}_2
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨  b^{1, 1157}_1
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨  p_1156 ∨ -b^{1, 1157}_0
c  in DIMACS:
-4628  4629 -4630  1156  4631 0
-4628  4629 -4630  1156  4632 0
-4628  4629 -4630  1156 -4633 0

c  -2-1 --> break 
c    ( b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-4628 -4629  4630  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1156}_2 ∧ -b^{1, 1156}_1 ∧ -b^{1, 1156}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1156}_2 ∨  b^{1, 1156}_1 ∨  b^{1, 1156}_0 ∨ false 
c  in DIMACS:
-4628  4629  4630  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧ true) 
c  in CNF:
c     b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ false 
c  in DIMACS:
 4628 -4629 -4630  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1156}_2 ∧  b^{1, 1156}_1 ∧  b^{1, 1156}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1156}_2 ∨ -b^{1, 1156}_1 ∨ -b^{1, 1156}_0 ∨ false 
c  in DIMACS:
-4628 -4629 -4630  0

c i = 1157
c  -2+1 --> -1
c    ( b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧  p_1157) -> ( b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0)
c  in CNF:
c    -b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨  b^{1, 1158}_2
c    -b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_1
c    -b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨  b^{1, 1158}_0
c  in DIMACS:
-4631 -4632  4633 -1157  4634 0
-4631 -4632  4633 -1157 -4635 0
-4631 -4632  4633 -1157  4636 0

c  -1+1 --> 0
c    ( b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧  p_1157) -> (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧ -b^{1, 1158}_0)
c  in CNF:
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_2
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_1
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_0
c  in DIMACS:
-4631  4632 -4633 -1157 -4634 0
-4631  4632 -4633 -1157 -4635 0
-4631  4632 -4633 -1157 -4636 0

c  0+1 --> 1
c    (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧  p_1157) -> (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0)
c  in CNF:
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_2
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_1
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨  b^{1, 1158}_0
c  in DIMACS:
 4631  4632  4633 -1157 -4634 0
 4631  4632  4633 -1157 -4635 0
 4631  4632  4633 -1157  4636 0

c  1+1 --> 2
c    (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧  p_1157) -> (-b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0)
c  in CNF:
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_2
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨  b^{1, 1158}_1
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ -p_1157 ∨ -b^{1, 1158}_0
c  in DIMACS:
 4631  4632 -4633 -1157 -4634 0
 4631  4632 -4633 -1157  4635 0
 4631  4632 -4633 -1157 -4636 0

c  2+1 --> break 
c    (-b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧  p_1157) -> break
c  in CNF:
c     b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ -p_1157 ∨ break
c  in DIMACS:
 4631 -4632  4633 -1157 1162 0


c  2-1 --> 1
c    (-b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧ -p_1157) -> (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0)
c  in CNF:
c     b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_2
c     b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_1
c     b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨  b^{1, 1158}_0
c  in DIMACS:
 4631 -4632  4633  1157 -4634 0
 4631 -4632  4633  1157 -4635 0
 4631 -4632  4633  1157  4636 0

c  1-1 --> 0
c    (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧ -p_1157) -> (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧ -b^{1, 1158}_0)
c  in CNF:
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_2
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_1
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_0
c  in DIMACS:
 4631  4632 -4633  1157 -4634 0
 4631  4632 -4633  1157 -4635 0
 4631  4632 -4633  1157 -4636 0

c  0-1 --> -1
c    (-b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧ -p_1157) -> ( b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0)
c  in CNF:
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨  b^{1, 1158}_2
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_1
c     b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨  b^{1, 1158}_0
c  in DIMACS:
 4631  4632  4633  1157  4634 0
 4631  4632  4633  1157 -4635 0
 4631  4632  4633  1157  4636 0

c  -1-1 --> -2
c    ( b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧ -p_1157) -> ( b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0)
c  in CNF:
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨  b^{1, 1158}_2
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨  b^{1, 1158}_1
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨  p_1157 ∨ -b^{1, 1158}_0
c  in DIMACS:
-4631  4632 -4633  1157  4634 0
-4631  4632 -4633  1157  4635 0
-4631  4632 -4633  1157 -4636 0

c  -2-1 --> break 
c    ( b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧ -p_1157) -> break
c  in CNF:
c    -b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨  p_1157 ∨ break
c  in DIMACS:
-4631 -4632  4633  1157 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1157}_2 ∧ -b^{1, 1157}_1 ∧ -b^{1, 1157}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1157}_2 ∨  b^{1, 1157}_1 ∨  b^{1, 1157}_0 ∨ false 
c  in DIMACS:
-4631  4632  4633  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧ true) 
c  in CNF:
c     b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ false 
c  in DIMACS:
 4631 -4632 -4633  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1157}_2 ∧  b^{1, 1157}_1 ∧  b^{1, 1157}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1157}_2 ∨ -b^{1, 1157}_1 ∨ -b^{1, 1157}_0 ∨ false 
c  in DIMACS:
-4631 -4632 -4633  0

c i = 1158
c  -2+1 --> -1
c    ( b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧  p_1158) -> ( b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0)
c  in CNF:
c    -b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨  b^{1, 1159}_2
c    -b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_1
c    -b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨  b^{1, 1159}_0
c  in DIMACS:
-4634 -4635  4636 -1158  4637 0
-4634 -4635  4636 -1158 -4638 0
-4634 -4635  4636 -1158  4639 0

c  -1+1 --> 0
c    ( b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧  p_1158) -> (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧ -b^{1, 1159}_0)
c  in CNF:
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_2
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_1
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_0
c  in DIMACS:
-4634  4635 -4636 -1158 -4637 0
-4634  4635 -4636 -1158 -4638 0
-4634  4635 -4636 -1158 -4639 0

c  0+1 --> 1
c    (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧  p_1158) -> (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0)
c  in CNF:
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_2
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_1
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨  b^{1, 1159}_0
c  in DIMACS:
 4634  4635  4636 -1158 -4637 0
 4634  4635  4636 -1158 -4638 0
 4634  4635  4636 -1158  4639 0

c  1+1 --> 2
c    (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧  p_1158) -> (-b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0)
c  in CNF:
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_2
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨  b^{1, 1159}_1
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ -p_1158 ∨ -b^{1, 1159}_0
c  in DIMACS:
 4634  4635 -4636 -1158 -4637 0
 4634  4635 -4636 -1158  4638 0
 4634  4635 -4636 -1158 -4639 0

c  2+1 --> break 
c    (-b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 4634 -4635  4636 -1158 1162 0


c  2-1 --> 1
c    (-b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧ -p_1158) -> (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0)
c  in CNF:
c     b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_2
c     b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_1
c     b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨  b^{1, 1159}_0
c  in DIMACS:
 4634 -4635  4636  1158 -4637 0
 4634 -4635  4636  1158 -4638 0
 4634 -4635  4636  1158  4639 0

c  1-1 --> 0
c    (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧ -p_1158) -> (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧ -b^{1, 1159}_0)
c  in CNF:
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_2
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_1
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_0
c  in DIMACS:
 4634  4635 -4636  1158 -4637 0
 4634  4635 -4636  1158 -4638 0
 4634  4635 -4636  1158 -4639 0

c  0-1 --> -1
c    (-b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧ -p_1158) -> ( b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0)
c  in CNF:
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨  b^{1, 1159}_2
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_1
c     b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨  b^{1, 1159}_0
c  in DIMACS:
 4634  4635  4636  1158  4637 0
 4634  4635  4636  1158 -4638 0
 4634  4635  4636  1158  4639 0

c  -1-1 --> -2
c    ( b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧ -p_1158) -> ( b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0)
c  in CNF:
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨  b^{1, 1159}_2
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨  b^{1, 1159}_1
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨  p_1158 ∨ -b^{1, 1159}_0
c  in DIMACS:
-4634  4635 -4636  1158  4637 0
-4634  4635 -4636  1158  4638 0
-4634  4635 -4636  1158 -4639 0

c  -2-1 --> break 
c    ( b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-4634 -4635  4636  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1158}_2 ∧ -b^{1, 1158}_1 ∧ -b^{1, 1158}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1158}_2 ∨  b^{1, 1158}_1 ∨  b^{1, 1158}_0 ∨ false 
c  in DIMACS:
-4634  4635  4636  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧ true) 
c  in CNF:
c     b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ false 
c  in DIMACS:
 4634 -4635 -4636  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1158}_2 ∧  b^{1, 1158}_1 ∧  b^{1, 1158}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1158}_2 ∨ -b^{1, 1158}_1 ∨ -b^{1, 1158}_0 ∨ false 
c  in DIMACS:
-4634 -4635 -4636  0

c i = 1159
c  -2+1 --> -1
c    ( b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧  p_1159) -> ( b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0)
c  in CNF:
c    -b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨  b^{1, 1160}_2
c    -b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_1
c    -b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨  b^{1, 1160}_0
c  in DIMACS:
-4637 -4638  4639 -1159  4640 0
-4637 -4638  4639 -1159 -4641 0
-4637 -4638  4639 -1159  4642 0

c  -1+1 --> 0
c    ( b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧  p_1159) -> (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧ -b^{1, 1160}_0)
c  in CNF:
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_2
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_1
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_0
c  in DIMACS:
-4637  4638 -4639 -1159 -4640 0
-4637  4638 -4639 -1159 -4641 0
-4637  4638 -4639 -1159 -4642 0

c  0+1 --> 1
c    (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧  p_1159) -> (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0)
c  in CNF:
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_2
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_1
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨  b^{1, 1160}_0
c  in DIMACS:
 4637  4638  4639 -1159 -4640 0
 4637  4638  4639 -1159 -4641 0
 4637  4638  4639 -1159  4642 0

c  1+1 --> 2
c    (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧  p_1159) -> (-b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0)
c  in CNF:
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_2
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨  b^{1, 1160}_1
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ -p_1159 ∨ -b^{1, 1160}_0
c  in DIMACS:
 4637  4638 -4639 -1159 -4640 0
 4637  4638 -4639 -1159  4641 0
 4637  4638 -4639 -1159 -4642 0

c  2+1 --> break 
c    (-b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧  p_1159) -> break
c  in CNF:
c     b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ -p_1159 ∨ break
c  in DIMACS:
 4637 -4638  4639 -1159 1162 0


c  2-1 --> 1
c    (-b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧ -p_1159) -> (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0)
c  in CNF:
c     b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_2
c     b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_1
c     b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨  b^{1, 1160}_0
c  in DIMACS:
 4637 -4638  4639  1159 -4640 0
 4637 -4638  4639  1159 -4641 0
 4637 -4638  4639  1159  4642 0

c  1-1 --> 0
c    (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧ -p_1159) -> (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧ -b^{1, 1160}_0)
c  in CNF:
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_2
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_1
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_0
c  in DIMACS:
 4637  4638 -4639  1159 -4640 0
 4637  4638 -4639  1159 -4641 0
 4637  4638 -4639  1159 -4642 0

c  0-1 --> -1
c    (-b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧ -p_1159) -> ( b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0)
c  in CNF:
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨  b^{1, 1160}_2
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_1
c     b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨  b^{1, 1160}_0
c  in DIMACS:
 4637  4638  4639  1159  4640 0
 4637  4638  4639  1159 -4641 0
 4637  4638  4639  1159  4642 0

c  -1-1 --> -2
c    ( b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧ -p_1159) -> ( b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0)
c  in CNF:
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨  b^{1, 1160}_2
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨  b^{1, 1160}_1
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨  p_1159 ∨ -b^{1, 1160}_0
c  in DIMACS:
-4637  4638 -4639  1159  4640 0
-4637  4638 -4639  1159  4641 0
-4637  4638 -4639  1159 -4642 0

c  -2-1 --> break 
c    ( b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧ -p_1159) -> break
c  in CNF:
c    -b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨  p_1159 ∨ break
c  in DIMACS:
-4637 -4638  4639  1159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1159}_2 ∧ -b^{1, 1159}_1 ∧ -b^{1, 1159}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1159}_2 ∨  b^{1, 1159}_1 ∨  b^{1, 1159}_0 ∨ false 
c  in DIMACS:
-4637  4638  4639  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧ true) 
c  in CNF:
c     b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ false 
c  in DIMACS:
 4637 -4638 -4639  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1159}_2 ∧  b^{1, 1159}_1 ∧  b^{1, 1159}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1159}_2 ∨ -b^{1, 1159}_1 ∨ -b^{1, 1159}_0 ∨ false 
c  in DIMACS:
-4637 -4638 -4639  0

c i = 1160
c  -2+1 --> -1
c    ( b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧  p_1160) -> ( b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0)
c  in CNF:
c    -b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨  b^{1, 1161}_2
c    -b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_1
c    -b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨  b^{1, 1161}_0
c  in DIMACS:
-4640 -4641  4642 -1160  4643 0
-4640 -4641  4642 -1160 -4644 0
-4640 -4641  4642 -1160  4645 0

c  -1+1 --> 0
c    ( b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧  p_1160) -> (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧ -b^{1, 1161}_0)
c  in CNF:
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_2
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_1
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_0
c  in DIMACS:
-4640  4641 -4642 -1160 -4643 0
-4640  4641 -4642 -1160 -4644 0
-4640  4641 -4642 -1160 -4645 0

c  0+1 --> 1
c    (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧  p_1160) -> (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0)
c  in CNF:
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_2
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_1
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨  b^{1, 1161}_0
c  in DIMACS:
 4640  4641  4642 -1160 -4643 0
 4640  4641  4642 -1160 -4644 0
 4640  4641  4642 -1160  4645 0

c  1+1 --> 2
c    (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧  p_1160) -> (-b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0)
c  in CNF:
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_2
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨  b^{1, 1161}_1
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ -p_1160 ∨ -b^{1, 1161}_0
c  in DIMACS:
 4640  4641 -4642 -1160 -4643 0
 4640  4641 -4642 -1160  4644 0
 4640  4641 -4642 -1160 -4645 0

c  2+1 --> break 
c    (-b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 4640 -4641  4642 -1160 1162 0


c  2-1 --> 1
c    (-b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧ -p_1160) -> (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0)
c  in CNF:
c     b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_2
c     b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_1
c     b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨  b^{1, 1161}_0
c  in DIMACS:
 4640 -4641  4642  1160 -4643 0
 4640 -4641  4642  1160 -4644 0
 4640 -4641  4642  1160  4645 0

c  1-1 --> 0
c    (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧ -p_1160) -> (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧ -b^{1, 1161}_0)
c  in CNF:
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_2
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_1
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_0
c  in DIMACS:
 4640  4641 -4642  1160 -4643 0
 4640  4641 -4642  1160 -4644 0
 4640  4641 -4642  1160 -4645 0

c  0-1 --> -1
c    (-b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧ -p_1160) -> ( b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0)
c  in CNF:
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨  b^{1, 1161}_2
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_1
c     b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨  b^{1, 1161}_0
c  in DIMACS:
 4640  4641  4642  1160  4643 0
 4640  4641  4642  1160 -4644 0
 4640  4641  4642  1160  4645 0

c  -1-1 --> -2
c    ( b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧ -p_1160) -> ( b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0)
c  in CNF:
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨  b^{1, 1161}_2
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨  b^{1, 1161}_1
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨  p_1160 ∨ -b^{1, 1161}_0
c  in DIMACS:
-4640  4641 -4642  1160  4643 0
-4640  4641 -4642  1160  4644 0
-4640  4641 -4642  1160 -4645 0

c  -2-1 --> break 
c    ( b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-4640 -4641  4642  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1160}_2 ∧ -b^{1, 1160}_1 ∧ -b^{1, 1160}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1160}_2 ∨  b^{1, 1160}_1 ∨  b^{1, 1160}_0 ∨ false 
c  in DIMACS:
-4640  4641  4642  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧ true) 
c  in CNF:
c     b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ false 
c  in DIMACS:
 4640 -4641 -4642  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1160}_2 ∧  b^{1, 1160}_1 ∧  b^{1, 1160}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1160}_2 ∨ -b^{1, 1160}_1 ∨ -b^{1, 1160}_0 ∨ false 
c  in DIMACS:
-4640 -4641 -4642  0

c i = 1161
c  -2+1 --> -1
c    ( b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧  p_1161) -> ( b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧  b^{1, 1162}_0)
c  in CNF:
c    -b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨  b^{1, 1162}_2
c    -b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_1
c    -b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨  b^{1, 1162}_0
c  in DIMACS:
-4643 -4644  4645 -1161  4646 0
-4643 -4644  4645 -1161 -4647 0
-4643 -4644  4645 -1161  4648 0

c  -1+1 --> 0
c    ( b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧  p_1161) -> (-b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧ -b^{1, 1162}_0)
c  in CNF:
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_2
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_1
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_0
c  in DIMACS:
-4643  4644 -4645 -1161 -4646 0
-4643  4644 -4645 -1161 -4647 0
-4643  4644 -4645 -1161 -4648 0

c  0+1 --> 1
c    (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧  p_1161) -> (-b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧  b^{1, 1162}_0)
c  in CNF:
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_2
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_1
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨  b^{1, 1162}_0
c  in DIMACS:
 4643  4644  4645 -1161 -4646 0
 4643  4644  4645 -1161 -4647 0
 4643  4644  4645 -1161  4648 0

c  1+1 --> 2
c    (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧  p_1161) -> (-b^{1, 1162}_2 ∧  b^{1, 1162}_1 ∧ -b^{1, 1162}_0)
c  in CNF:
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_2
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨  b^{1, 1162}_1
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ -p_1161 ∨ -b^{1, 1162}_0
c  in DIMACS:
 4643  4644 -4645 -1161 -4646 0
 4643  4644 -4645 -1161  4647 0
 4643  4644 -4645 -1161 -4648 0

c  2+1 --> break 
c    (-b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 4643 -4644  4645 -1161 1162 0


c  2-1 --> 1
c    (-b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧ -p_1161) -> (-b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧  b^{1, 1162}_0)
c  in CNF:
c     b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_2
c     b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_1
c     b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨  b^{1, 1162}_0
c  in DIMACS:
 4643 -4644  4645  1161 -4646 0
 4643 -4644  4645  1161 -4647 0
 4643 -4644  4645  1161  4648 0

c  1-1 --> 0
c    (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧ -p_1161) -> (-b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧ -b^{1, 1162}_0)
c  in CNF:
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_2
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_1
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_0
c  in DIMACS:
 4643  4644 -4645  1161 -4646 0
 4643  4644 -4645  1161 -4647 0
 4643  4644 -4645  1161 -4648 0

c  0-1 --> -1
c    (-b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧ -p_1161) -> ( b^{1, 1162}_2 ∧ -b^{1, 1162}_1 ∧  b^{1, 1162}_0)
c  in CNF:
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨  b^{1, 1162}_2
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_1
c     b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨  b^{1, 1162}_0
c  in DIMACS:
 4643  4644  4645  1161  4646 0
 4643  4644  4645  1161 -4647 0
 4643  4644  4645  1161  4648 0

c  -1-1 --> -2
c    ( b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧ -p_1161) -> ( b^{1, 1162}_2 ∧  b^{1, 1162}_1 ∧ -b^{1, 1162}_0)
c  in CNF:
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨  b^{1, 1162}_2
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨  b^{1, 1162}_1
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨  p_1161 ∨ -b^{1, 1162}_0
c  in DIMACS:
-4643  4644 -4645  1161  4646 0
-4643  4644 -4645  1161  4647 0
-4643  4644 -4645  1161 -4648 0

c  -2-1 --> break 
c    ( b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-4643 -4644  4645  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{1, 1161}_2 ∧ -b^{1, 1161}_1 ∧ -b^{1, 1161}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1161}_2 ∨  b^{1, 1161}_1 ∨  b^{1, 1161}_0 ∨ false 
c  in DIMACS:
-4643  4644  4645  0

c  3 does not represent an automaton state.
c    -(-b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧ true) 
c  in CNF:
c     b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ false 
c  in DIMACS:
 4643 -4644 -4645  0
c  -3 does not represent an automaton state.
c    -( b^{1, 1161}_2 ∧  b^{1, 1161}_1 ∧  b^{1, 1161}_0 ∧ true) 
c  in CNF:
c    -b^{1, 1161}_2 ∨ -b^{1, 1161}_1 ∨ -b^{1, 1161}_0 ∨ false 
c  in DIMACS:
-4643 -4644 -4645  0

c INIT for k = 2
c    -b^{2, 1}_2
c    -b^{2, 1}_1
c    -b^{2, 1}_0
c  in DIMACS:
-4649 0
-4650 0
-4651 0

c Transitions for k = 2
c i = 1
c  -2+1 --> -1
c    ( b^{2, 1}_2 ∧  b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧  p_2) -> ( b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0)
c  in CNF:
c    -b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨  b^{2, 2}_2
c    -b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_1
c    -b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨  b^{2, 2}_0
c  in DIMACS:
-4649 -4650  4651 -2  4652 0
-4649 -4650  4651 -2 -4653 0
-4649 -4650  4651 -2  4654 0

c  -1+1 --> 0
c    ( b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧  b^{2, 1}_0 ∧  p_2) -> (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧ -b^{2, 2}_0)
c  in CNF:
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_2
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_1
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_0
c  in DIMACS:
-4649  4650 -4651 -2 -4652 0
-4649  4650 -4651 -2 -4653 0
-4649  4650 -4651 -2 -4654 0

c  0+1 --> 1
c    (-b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧  p_2) -> (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0)
c  in CNF:
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_2
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_1
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨  b^{2, 2}_0
c  in DIMACS:
 4649  4650  4651 -2 -4652 0
 4649  4650  4651 -2 -4653 0
 4649  4650  4651 -2  4654 0

c  1+1 --> 2
c    (-b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧  b^{2, 1}_0 ∧  p_2) -> (-b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0)
c  in CNF:
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_2
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨  b^{2, 2}_1
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ -p_2 ∨ -b^{2, 2}_0
c  in DIMACS:
 4649  4650 -4651 -2 -4652 0
 4649  4650 -4651 -2  4653 0
 4649  4650 -4651 -2 -4654 0

c  2+1 --> break 
c    (-b^{2, 1}_2 ∧  b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧  p_2) -> break
c  in CNF:
c     b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ -p_2 ∨ break
c  in DIMACS:
 4649 -4650  4651 -2 1162 0


c  2-1 --> 1
c    (-b^{2, 1}_2 ∧  b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧ -p_2) -> (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0)
c  in CNF:
c     b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_2
c     b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_1
c     b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨  b^{2, 2}_0
c  in DIMACS:
 4649 -4650  4651  2 -4652 0
 4649 -4650  4651  2 -4653 0
 4649 -4650  4651  2  4654 0

c  1-1 --> 0
c    (-b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧  b^{2, 1}_0 ∧ -p_2) -> (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧ -b^{2, 2}_0)
c  in CNF:
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_2
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_1
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_0
c  in DIMACS:
 4649  4650 -4651  2 -4652 0
 4649  4650 -4651  2 -4653 0
 4649  4650 -4651  2 -4654 0

c  0-1 --> -1
c    (-b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧ -p_2) -> ( b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0)
c  in CNF:
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨  b^{2, 2}_2
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_1
c     b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨  b^{2, 2}_0
c  in DIMACS:
 4649  4650  4651  2  4652 0
 4649  4650  4651  2 -4653 0
 4649  4650  4651  2  4654 0

c  -1-1 --> -2
c    ( b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧  b^{2, 1}_0 ∧ -p_2) -> ( b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0)
c  in CNF:
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨  b^{2, 2}_2
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨  b^{2, 2}_1
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨  p_2 ∨ -b^{2, 2}_0
c  in DIMACS:
-4649  4650 -4651  2  4652 0
-4649  4650 -4651  2  4653 0
-4649  4650 -4651  2 -4654 0

c  -2-1 --> break 
c    ( b^{2, 1}_2 ∧  b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧ -p_2) -> break
c  in CNF:
c    -b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨  b^{2, 1}_0 ∨  p_2 ∨ break
c  in DIMACS:
-4649 -4650  4651  2 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 1}_2 ∧ -b^{2, 1}_1 ∧ -b^{2, 1}_0 ∧ true) 
c  in CNF:
c    -b^{2, 1}_2 ∨  b^{2, 1}_1 ∨  b^{2, 1}_0 ∨ false 
c  in DIMACS:
-4649  4650  4651  0

c  3 does not represent an automaton state.
c    -(-b^{2, 1}_2 ∧  b^{2, 1}_1 ∧  b^{2, 1}_0 ∧ true) 
c  in CNF:
c     b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ false 
c  in DIMACS:
 4649 -4650 -4651  0
c  -3 does not represent an automaton state.
c    -( b^{2, 1}_2 ∧  b^{2, 1}_1 ∧  b^{2, 1}_0 ∧ true) 
c  in CNF:
c    -b^{2, 1}_2 ∨ -b^{2, 1}_1 ∨ -b^{2, 1}_0 ∨ false 
c  in DIMACS:
-4649 -4650 -4651  0

c i = 2
c  -2+1 --> -1
c    ( b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧  p_4) -> ( b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0)
c  in CNF:
c    -b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨  b^{2, 3}_2
c    -b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_1
c    -b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨  b^{2, 3}_0
c  in DIMACS:
-4652 -4653  4654 -4  4655 0
-4652 -4653  4654 -4 -4656 0
-4652 -4653  4654 -4  4657 0

c  -1+1 --> 0
c    ( b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0 ∧  p_4) -> (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧ -b^{2, 3}_0)
c  in CNF:
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_2
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_1
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_0
c  in DIMACS:
-4652  4653 -4654 -4 -4655 0
-4652  4653 -4654 -4 -4656 0
-4652  4653 -4654 -4 -4657 0

c  0+1 --> 1
c    (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧  p_4) -> (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0)
c  in CNF:
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_2
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_1
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨  b^{2, 3}_0
c  in DIMACS:
 4652  4653  4654 -4 -4655 0
 4652  4653  4654 -4 -4656 0
 4652  4653  4654 -4  4657 0

c  1+1 --> 2
c    (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0 ∧  p_4) -> (-b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0)
c  in CNF:
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_2
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨  b^{2, 3}_1
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ -p_4 ∨ -b^{2, 3}_0
c  in DIMACS:
 4652  4653 -4654 -4 -4655 0
 4652  4653 -4654 -4  4656 0
 4652  4653 -4654 -4 -4657 0

c  2+1 --> break 
c    (-b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧  p_4) -> break
c  in CNF:
c     b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ -p_4 ∨ break
c  in DIMACS:
 4652 -4653  4654 -4 1162 0


c  2-1 --> 1
c    (-b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧ -p_4) -> (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0)
c  in CNF:
c     b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_2
c     b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_1
c     b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨  b^{2, 3}_0
c  in DIMACS:
 4652 -4653  4654  4 -4655 0
 4652 -4653  4654  4 -4656 0
 4652 -4653  4654  4  4657 0

c  1-1 --> 0
c    (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0 ∧ -p_4) -> (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧ -b^{2, 3}_0)
c  in CNF:
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_2
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_1
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_0
c  in DIMACS:
 4652  4653 -4654  4 -4655 0
 4652  4653 -4654  4 -4656 0
 4652  4653 -4654  4 -4657 0

c  0-1 --> -1
c    (-b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧ -p_4) -> ( b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0)
c  in CNF:
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨  b^{2, 3}_2
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_1
c     b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨  b^{2, 3}_0
c  in DIMACS:
 4652  4653  4654  4  4655 0
 4652  4653  4654  4 -4656 0
 4652  4653  4654  4  4657 0

c  -1-1 --> -2
c    ( b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧  b^{2, 2}_0 ∧ -p_4) -> ( b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0)
c  in CNF:
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨  b^{2, 3}_2
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨  b^{2, 3}_1
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨  p_4 ∨ -b^{2, 3}_0
c  in DIMACS:
-4652  4653 -4654  4  4655 0
-4652  4653 -4654  4  4656 0
-4652  4653 -4654  4 -4657 0

c  -2-1 --> break 
c    ( b^{2, 2}_2 ∧  b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧ -p_4) -> break
c  in CNF:
c    -b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨  b^{2, 2}_0 ∨  p_4 ∨ break
c  in DIMACS:
-4652 -4653  4654  4 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 2}_2 ∧ -b^{2, 2}_1 ∧ -b^{2, 2}_0 ∧ true) 
c  in CNF:
c    -b^{2, 2}_2 ∨  b^{2, 2}_1 ∨  b^{2, 2}_0 ∨ false 
c  in DIMACS:
-4652  4653  4654  0

c  3 does not represent an automaton state.
c    -(-b^{2, 2}_2 ∧  b^{2, 2}_1 ∧  b^{2, 2}_0 ∧ true) 
c  in CNF:
c     b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ false 
c  in DIMACS:
 4652 -4653 -4654  0
c  -3 does not represent an automaton state.
c    -( b^{2, 2}_2 ∧  b^{2, 2}_1 ∧  b^{2, 2}_0 ∧ true) 
c  in CNF:
c    -b^{2, 2}_2 ∨ -b^{2, 2}_1 ∨ -b^{2, 2}_0 ∨ false 
c  in DIMACS:
-4652 -4653 -4654  0

c i = 3
c  -2+1 --> -1
c    ( b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧  p_6) -> ( b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0)
c  in CNF:
c    -b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨  b^{2, 4}_2
c    -b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_1
c    -b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨  b^{2, 4}_0
c  in DIMACS:
-4655 -4656  4657 -6  4658 0
-4655 -4656  4657 -6 -4659 0
-4655 -4656  4657 -6  4660 0

c  -1+1 --> 0
c    ( b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0 ∧  p_6) -> (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧ -b^{2, 4}_0)
c  in CNF:
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_2
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_1
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_0
c  in DIMACS:
-4655  4656 -4657 -6 -4658 0
-4655  4656 -4657 -6 -4659 0
-4655  4656 -4657 -6 -4660 0

c  0+1 --> 1
c    (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧  p_6) -> (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0)
c  in CNF:
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_2
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_1
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨  b^{2, 4}_0
c  in DIMACS:
 4655  4656  4657 -6 -4658 0
 4655  4656  4657 -6 -4659 0
 4655  4656  4657 -6  4660 0

c  1+1 --> 2
c    (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0 ∧  p_6) -> (-b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0)
c  in CNF:
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_2
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨  b^{2, 4}_1
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ -p_6 ∨ -b^{2, 4}_0
c  in DIMACS:
 4655  4656 -4657 -6 -4658 0
 4655  4656 -4657 -6  4659 0
 4655  4656 -4657 -6 -4660 0

c  2+1 --> break 
c    (-b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧  p_6) -> break
c  in CNF:
c     b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ -p_6 ∨ break
c  in DIMACS:
 4655 -4656  4657 -6 1162 0


c  2-1 --> 1
c    (-b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧ -p_6) -> (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0)
c  in CNF:
c     b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_2
c     b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_1
c     b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨  b^{2, 4}_0
c  in DIMACS:
 4655 -4656  4657  6 -4658 0
 4655 -4656  4657  6 -4659 0
 4655 -4656  4657  6  4660 0

c  1-1 --> 0
c    (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0 ∧ -p_6) -> (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧ -b^{2, 4}_0)
c  in CNF:
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_2
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_1
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_0
c  in DIMACS:
 4655  4656 -4657  6 -4658 0
 4655  4656 -4657  6 -4659 0
 4655  4656 -4657  6 -4660 0

c  0-1 --> -1
c    (-b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧ -p_6) -> ( b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0)
c  in CNF:
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨  b^{2, 4}_2
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_1
c     b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨  b^{2, 4}_0
c  in DIMACS:
 4655  4656  4657  6  4658 0
 4655  4656  4657  6 -4659 0
 4655  4656  4657  6  4660 0

c  -1-1 --> -2
c    ( b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧  b^{2, 3}_0 ∧ -p_6) -> ( b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0)
c  in CNF:
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨  b^{2, 4}_2
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨  b^{2, 4}_1
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨  p_6 ∨ -b^{2, 4}_0
c  in DIMACS:
-4655  4656 -4657  6  4658 0
-4655  4656 -4657  6  4659 0
-4655  4656 -4657  6 -4660 0

c  -2-1 --> break 
c    ( b^{2, 3}_2 ∧  b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧ -p_6) -> break
c  in CNF:
c    -b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨  b^{2, 3}_0 ∨  p_6 ∨ break
c  in DIMACS:
-4655 -4656  4657  6 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 3}_2 ∧ -b^{2, 3}_1 ∧ -b^{2, 3}_0 ∧ true) 
c  in CNF:
c    -b^{2, 3}_2 ∨  b^{2, 3}_1 ∨  b^{2, 3}_0 ∨ false 
c  in DIMACS:
-4655  4656  4657  0

c  3 does not represent an automaton state.
c    -(-b^{2, 3}_2 ∧  b^{2, 3}_1 ∧  b^{2, 3}_0 ∧ true) 
c  in CNF:
c     b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ false 
c  in DIMACS:
 4655 -4656 -4657  0
c  -3 does not represent an automaton state.
c    -( b^{2, 3}_2 ∧  b^{2, 3}_1 ∧  b^{2, 3}_0 ∧ true) 
c  in CNF:
c    -b^{2, 3}_2 ∨ -b^{2, 3}_1 ∨ -b^{2, 3}_0 ∨ false 
c  in DIMACS:
-4655 -4656 -4657  0

c i = 4
c  -2+1 --> -1
c    ( b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧  p_8) -> ( b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0)
c  in CNF:
c    -b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨  b^{2, 5}_2
c    -b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_1
c    -b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨  b^{2, 5}_0
c  in DIMACS:
-4658 -4659  4660 -8  4661 0
-4658 -4659  4660 -8 -4662 0
-4658 -4659  4660 -8  4663 0

c  -1+1 --> 0
c    ( b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0 ∧  p_8) -> (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧ -b^{2, 5}_0)
c  in CNF:
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_2
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_1
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_0
c  in DIMACS:
-4658  4659 -4660 -8 -4661 0
-4658  4659 -4660 -8 -4662 0
-4658  4659 -4660 -8 -4663 0

c  0+1 --> 1
c    (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧  p_8) -> (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0)
c  in CNF:
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_2
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_1
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨  b^{2, 5}_0
c  in DIMACS:
 4658  4659  4660 -8 -4661 0
 4658  4659  4660 -8 -4662 0
 4658  4659  4660 -8  4663 0

c  1+1 --> 2
c    (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0 ∧  p_8) -> (-b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0)
c  in CNF:
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_2
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨  b^{2, 5}_1
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ -p_8 ∨ -b^{2, 5}_0
c  in DIMACS:
 4658  4659 -4660 -8 -4661 0
 4658  4659 -4660 -8  4662 0
 4658  4659 -4660 -8 -4663 0

c  2+1 --> break 
c    (-b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧  p_8) -> break
c  in CNF:
c     b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ -p_8 ∨ break
c  in DIMACS:
 4658 -4659  4660 -8 1162 0


c  2-1 --> 1
c    (-b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧ -p_8) -> (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0)
c  in CNF:
c     b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_2
c     b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_1
c     b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨  b^{2, 5}_0
c  in DIMACS:
 4658 -4659  4660  8 -4661 0
 4658 -4659  4660  8 -4662 0
 4658 -4659  4660  8  4663 0

c  1-1 --> 0
c    (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0 ∧ -p_8) -> (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧ -b^{2, 5}_0)
c  in CNF:
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_2
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_1
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_0
c  in DIMACS:
 4658  4659 -4660  8 -4661 0
 4658  4659 -4660  8 -4662 0
 4658  4659 -4660  8 -4663 0

c  0-1 --> -1
c    (-b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧ -p_8) -> ( b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0)
c  in CNF:
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨  b^{2, 5}_2
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_1
c     b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨  b^{2, 5}_0
c  in DIMACS:
 4658  4659  4660  8  4661 0
 4658  4659  4660  8 -4662 0
 4658  4659  4660  8  4663 0

c  -1-1 --> -2
c    ( b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧  b^{2, 4}_0 ∧ -p_8) -> ( b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0)
c  in CNF:
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨  b^{2, 5}_2
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨  b^{2, 5}_1
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨  p_8 ∨ -b^{2, 5}_0
c  in DIMACS:
-4658  4659 -4660  8  4661 0
-4658  4659 -4660  8  4662 0
-4658  4659 -4660  8 -4663 0

c  -2-1 --> break 
c    ( b^{2, 4}_2 ∧  b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧ -p_8) -> break
c  in CNF:
c    -b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨  b^{2, 4}_0 ∨  p_8 ∨ break
c  in DIMACS:
-4658 -4659  4660  8 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 4}_2 ∧ -b^{2, 4}_1 ∧ -b^{2, 4}_0 ∧ true) 
c  in CNF:
c    -b^{2, 4}_2 ∨  b^{2, 4}_1 ∨  b^{2, 4}_0 ∨ false 
c  in DIMACS:
-4658  4659  4660  0

c  3 does not represent an automaton state.
c    -(-b^{2, 4}_2 ∧  b^{2, 4}_1 ∧  b^{2, 4}_0 ∧ true) 
c  in CNF:
c     b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ false 
c  in DIMACS:
 4658 -4659 -4660  0
c  -3 does not represent an automaton state.
c    -( b^{2, 4}_2 ∧  b^{2, 4}_1 ∧  b^{2, 4}_0 ∧ true) 
c  in CNF:
c    -b^{2, 4}_2 ∨ -b^{2, 4}_1 ∨ -b^{2, 4}_0 ∨ false 
c  in DIMACS:
-4658 -4659 -4660  0

c i = 5
c  -2+1 --> -1
c    ( b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧  p_10) -> ( b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0)
c  in CNF:
c    -b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨  b^{2, 6}_2
c    -b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_1
c    -b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨  b^{2, 6}_0
c  in DIMACS:
-4661 -4662  4663 -10  4664 0
-4661 -4662  4663 -10 -4665 0
-4661 -4662  4663 -10  4666 0

c  -1+1 --> 0
c    ( b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0 ∧  p_10) -> (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧ -b^{2, 6}_0)
c  in CNF:
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_2
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_1
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_0
c  in DIMACS:
-4661  4662 -4663 -10 -4664 0
-4661  4662 -4663 -10 -4665 0
-4661  4662 -4663 -10 -4666 0

c  0+1 --> 1
c    (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧  p_10) -> (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0)
c  in CNF:
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_2
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_1
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨  b^{2, 6}_0
c  in DIMACS:
 4661  4662  4663 -10 -4664 0
 4661  4662  4663 -10 -4665 0
 4661  4662  4663 -10  4666 0

c  1+1 --> 2
c    (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0 ∧  p_10) -> (-b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0)
c  in CNF:
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_2
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨  b^{2, 6}_1
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ -p_10 ∨ -b^{2, 6}_0
c  in DIMACS:
 4661  4662 -4663 -10 -4664 0
 4661  4662 -4663 -10  4665 0
 4661  4662 -4663 -10 -4666 0

c  2+1 --> break 
c    (-b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧  p_10) -> break
c  in CNF:
c     b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ -p_10 ∨ break
c  in DIMACS:
 4661 -4662  4663 -10 1162 0


c  2-1 --> 1
c    (-b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧ -p_10) -> (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0)
c  in CNF:
c     b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_2
c     b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_1
c     b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨  b^{2, 6}_0
c  in DIMACS:
 4661 -4662  4663  10 -4664 0
 4661 -4662  4663  10 -4665 0
 4661 -4662  4663  10  4666 0

c  1-1 --> 0
c    (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0 ∧ -p_10) -> (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧ -b^{2, 6}_0)
c  in CNF:
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_2
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_1
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_0
c  in DIMACS:
 4661  4662 -4663  10 -4664 0
 4661  4662 -4663  10 -4665 0
 4661  4662 -4663  10 -4666 0

c  0-1 --> -1
c    (-b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧ -p_10) -> ( b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0)
c  in CNF:
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨  b^{2, 6}_2
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_1
c     b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨  b^{2, 6}_0
c  in DIMACS:
 4661  4662  4663  10  4664 0
 4661  4662  4663  10 -4665 0
 4661  4662  4663  10  4666 0

c  -1-1 --> -2
c    ( b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧  b^{2, 5}_0 ∧ -p_10) -> ( b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0)
c  in CNF:
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨  b^{2, 6}_2
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨  b^{2, 6}_1
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨  p_10 ∨ -b^{2, 6}_0
c  in DIMACS:
-4661  4662 -4663  10  4664 0
-4661  4662 -4663  10  4665 0
-4661  4662 -4663  10 -4666 0

c  -2-1 --> break 
c    ( b^{2, 5}_2 ∧  b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧ -p_10) -> break
c  in CNF:
c    -b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨  b^{2, 5}_0 ∨  p_10 ∨ break
c  in DIMACS:
-4661 -4662  4663  10 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 5}_2 ∧ -b^{2, 5}_1 ∧ -b^{2, 5}_0 ∧ true) 
c  in CNF:
c    -b^{2, 5}_2 ∨  b^{2, 5}_1 ∨  b^{2, 5}_0 ∨ false 
c  in DIMACS:
-4661  4662  4663  0

c  3 does not represent an automaton state.
c    -(-b^{2, 5}_2 ∧  b^{2, 5}_1 ∧  b^{2, 5}_0 ∧ true) 
c  in CNF:
c     b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ false 
c  in DIMACS:
 4661 -4662 -4663  0
c  -3 does not represent an automaton state.
c    -( b^{2, 5}_2 ∧  b^{2, 5}_1 ∧  b^{2, 5}_0 ∧ true) 
c  in CNF:
c    -b^{2, 5}_2 ∨ -b^{2, 5}_1 ∨ -b^{2, 5}_0 ∨ false 
c  in DIMACS:
-4661 -4662 -4663  0

c i = 6
c  -2+1 --> -1
c    ( b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧  p_12) -> ( b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0)
c  in CNF:
c    -b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨  b^{2, 7}_2
c    -b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_1
c    -b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨  b^{2, 7}_0
c  in DIMACS:
-4664 -4665  4666 -12  4667 0
-4664 -4665  4666 -12 -4668 0
-4664 -4665  4666 -12  4669 0

c  -1+1 --> 0
c    ( b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0 ∧  p_12) -> (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧ -b^{2, 7}_0)
c  in CNF:
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_2
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_1
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_0
c  in DIMACS:
-4664  4665 -4666 -12 -4667 0
-4664  4665 -4666 -12 -4668 0
-4664  4665 -4666 -12 -4669 0

c  0+1 --> 1
c    (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧  p_12) -> (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0)
c  in CNF:
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_2
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_1
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨  b^{2, 7}_0
c  in DIMACS:
 4664  4665  4666 -12 -4667 0
 4664  4665  4666 -12 -4668 0
 4664  4665  4666 -12  4669 0

c  1+1 --> 2
c    (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0 ∧  p_12) -> (-b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0)
c  in CNF:
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_2
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨  b^{2, 7}_1
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ -p_12 ∨ -b^{2, 7}_0
c  in DIMACS:
 4664  4665 -4666 -12 -4667 0
 4664  4665 -4666 -12  4668 0
 4664  4665 -4666 -12 -4669 0

c  2+1 --> break 
c    (-b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧  p_12) -> break
c  in CNF:
c     b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 4664 -4665  4666 -12 1162 0


c  2-1 --> 1
c    (-b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧ -p_12) -> (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0)
c  in CNF:
c     b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_2
c     b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_1
c     b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨  b^{2, 7}_0
c  in DIMACS:
 4664 -4665  4666  12 -4667 0
 4664 -4665  4666  12 -4668 0
 4664 -4665  4666  12  4669 0

c  1-1 --> 0
c    (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0 ∧ -p_12) -> (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧ -b^{2, 7}_0)
c  in CNF:
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_2
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_1
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_0
c  in DIMACS:
 4664  4665 -4666  12 -4667 0
 4664  4665 -4666  12 -4668 0
 4664  4665 -4666  12 -4669 0

c  0-1 --> -1
c    (-b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧ -p_12) -> ( b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0)
c  in CNF:
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨  b^{2, 7}_2
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_1
c     b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨  b^{2, 7}_0
c  in DIMACS:
 4664  4665  4666  12  4667 0
 4664  4665  4666  12 -4668 0
 4664  4665  4666  12  4669 0

c  -1-1 --> -2
c    ( b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧  b^{2, 6}_0 ∧ -p_12) -> ( b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0)
c  in CNF:
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨  b^{2, 7}_2
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨  b^{2, 7}_1
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨  p_12 ∨ -b^{2, 7}_0
c  in DIMACS:
-4664  4665 -4666  12  4667 0
-4664  4665 -4666  12  4668 0
-4664  4665 -4666  12 -4669 0

c  -2-1 --> break 
c    ( b^{2, 6}_2 ∧  b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨  b^{2, 6}_0 ∨  p_12 ∨ break
c  in DIMACS:
-4664 -4665  4666  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 6}_2 ∧ -b^{2, 6}_1 ∧ -b^{2, 6}_0 ∧ true) 
c  in CNF:
c    -b^{2, 6}_2 ∨  b^{2, 6}_1 ∨  b^{2, 6}_0 ∨ false 
c  in DIMACS:
-4664  4665  4666  0

c  3 does not represent an automaton state.
c    -(-b^{2, 6}_2 ∧  b^{2, 6}_1 ∧  b^{2, 6}_0 ∧ true) 
c  in CNF:
c     b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ false 
c  in DIMACS:
 4664 -4665 -4666  0
c  -3 does not represent an automaton state.
c    -( b^{2, 6}_2 ∧  b^{2, 6}_1 ∧  b^{2, 6}_0 ∧ true) 
c  in CNF:
c    -b^{2, 6}_2 ∨ -b^{2, 6}_1 ∨ -b^{2, 6}_0 ∨ false 
c  in DIMACS:
-4664 -4665 -4666  0

c i = 7
c  -2+1 --> -1
c    ( b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧  p_14) -> ( b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0)
c  in CNF:
c    -b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨  b^{2, 8}_2
c    -b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_1
c    -b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨  b^{2, 8}_0
c  in DIMACS:
-4667 -4668  4669 -14  4670 0
-4667 -4668  4669 -14 -4671 0
-4667 -4668  4669 -14  4672 0

c  -1+1 --> 0
c    ( b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0 ∧  p_14) -> (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧ -b^{2, 8}_0)
c  in CNF:
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_2
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_1
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_0
c  in DIMACS:
-4667  4668 -4669 -14 -4670 0
-4667  4668 -4669 -14 -4671 0
-4667  4668 -4669 -14 -4672 0

c  0+1 --> 1
c    (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧  p_14) -> (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0)
c  in CNF:
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_2
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_1
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨  b^{2, 8}_0
c  in DIMACS:
 4667  4668  4669 -14 -4670 0
 4667  4668  4669 -14 -4671 0
 4667  4668  4669 -14  4672 0

c  1+1 --> 2
c    (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0 ∧  p_14) -> (-b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0)
c  in CNF:
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_2
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨  b^{2, 8}_1
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ -p_14 ∨ -b^{2, 8}_0
c  in DIMACS:
 4667  4668 -4669 -14 -4670 0
 4667  4668 -4669 -14  4671 0
 4667  4668 -4669 -14 -4672 0

c  2+1 --> break 
c    (-b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧  p_14) -> break
c  in CNF:
c     b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ -p_14 ∨ break
c  in DIMACS:
 4667 -4668  4669 -14 1162 0


c  2-1 --> 1
c    (-b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧ -p_14) -> (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0)
c  in CNF:
c     b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_2
c     b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_1
c     b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨  b^{2, 8}_0
c  in DIMACS:
 4667 -4668  4669  14 -4670 0
 4667 -4668  4669  14 -4671 0
 4667 -4668  4669  14  4672 0

c  1-1 --> 0
c    (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0 ∧ -p_14) -> (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧ -b^{2, 8}_0)
c  in CNF:
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_2
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_1
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_0
c  in DIMACS:
 4667  4668 -4669  14 -4670 0
 4667  4668 -4669  14 -4671 0
 4667  4668 -4669  14 -4672 0

c  0-1 --> -1
c    (-b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧ -p_14) -> ( b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0)
c  in CNF:
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨  b^{2, 8}_2
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_1
c     b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨  b^{2, 8}_0
c  in DIMACS:
 4667  4668  4669  14  4670 0
 4667  4668  4669  14 -4671 0
 4667  4668  4669  14  4672 0

c  -1-1 --> -2
c    ( b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧  b^{2, 7}_0 ∧ -p_14) -> ( b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0)
c  in CNF:
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨  b^{2, 8}_2
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨  b^{2, 8}_1
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨  p_14 ∨ -b^{2, 8}_0
c  in DIMACS:
-4667  4668 -4669  14  4670 0
-4667  4668 -4669  14  4671 0
-4667  4668 -4669  14 -4672 0

c  -2-1 --> break 
c    ( b^{2, 7}_2 ∧  b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧ -p_14) -> break
c  in CNF:
c    -b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨  b^{2, 7}_0 ∨  p_14 ∨ break
c  in DIMACS:
-4667 -4668  4669  14 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 7}_2 ∧ -b^{2, 7}_1 ∧ -b^{2, 7}_0 ∧ true) 
c  in CNF:
c    -b^{2, 7}_2 ∨  b^{2, 7}_1 ∨  b^{2, 7}_0 ∨ false 
c  in DIMACS:
-4667  4668  4669  0

c  3 does not represent an automaton state.
c    -(-b^{2, 7}_2 ∧  b^{2, 7}_1 ∧  b^{2, 7}_0 ∧ true) 
c  in CNF:
c     b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ false 
c  in DIMACS:
 4667 -4668 -4669  0
c  -3 does not represent an automaton state.
c    -( b^{2, 7}_2 ∧  b^{2, 7}_1 ∧  b^{2, 7}_0 ∧ true) 
c  in CNF:
c    -b^{2, 7}_2 ∨ -b^{2, 7}_1 ∨ -b^{2, 7}_0 ∨ false 
c  in DIMACS:
-4667 -4668 -4669  0

c i = 8
c  -2+1 --> -1
c    ( b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧  p_16) -> ( b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0)
c  in CNF:
c    -b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨  b^{2, 9}_2
c    -b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_1
c    -b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨  b^{2, 9}_0
c  in DIMACS:
-4670 -4671  4672 -16  4673 0
-4670 -4671  4672 -16 -4674 0
-4670 -4671  4672 -16  4675 0

c  -1+1 --> 0
c    ( b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0 ∧  p_16) -> (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧ -b^{2, 9}_0)
c  in CNF:
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_2
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_1
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_0
c  in DIMACS:
-4670  4671 -4672 -16 -4673 0
-4670  4671 -4672 -16 -4674 0
-4670  4671 -4672 -16 -4675 0

c  0+1 --> 1
c    (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧  p_16) -> (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0)
c  in CNF:
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_2
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_1
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨  b^{2, 9}_0
c  in DIMACS:
 4670  4671  4672 -16 -4673 0
 4670  4671  4672 -16 -4674 0
 4670  4671  4672 -16  4675 0

c  1+1 --> 2
c    (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0 ∧  p_16) -> (-b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0)
c  in CNF:
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_2
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨  b^{2, 9}_1
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ -p_16 ∨ -b^{2, 9}_0
c  in DIMACS:
 4670  4671 -4672 -16 -4673 0
 4670  4671 -4672 -16  4674 0
 4670  4671 -4672 -16 -4675 0

c  2+1 --> break 
c    (-b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧  p_16) -> break
c  in CNF:
c     b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ -p_16 ∨ break
c  in DIMACS:
 4670 -4671  4672 -16 1162 0


c  2-1 --> 1
c    (-b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧ -p_16) -> (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0)
c  in CNF:
c     b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_2
c     b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_1
c     b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨  b^{2, 9}_0
c  in DIMACS:
 4670 -4671  4672  16 -4673 0
 4670 -4671  4672  16 -4674 0
 4670 -4671  4672  16  4675 0

c  1-1 --> 0
c    (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0 ∧ -p_16) -> (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧ -b^{2, 9}_0)
c  in CNF:
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_2
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_1
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_0
c  in DIMACS:
 4670  4671 -4672  16 -4673 0
 4670  4671 -4672  16 -4674 0
 4670  4671 -4672  16 -4675 0

c  0-1 --> -1
c    (-b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧ -p_16) -> ( b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0)
c  in CNF:
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨  b^{2, 9}_2
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_1
c     b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨  b^{2, 9}_0
c  in DIMACS:
 4670  4671  4672  16  4673 0
 4670  4671  4672  16 -4674 0
 4670  4671  4672  16  4675 0

c  -1-1 --> -2
c    ( b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧  b^{2, 8}_0 ∧ -p_16) -> ( b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0)
c  in CNF:
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨  b^{2, 9}_2
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨  b^{2, 9}_1
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨  p_16 ∨ -b^{2, 9}_0
c  in DIMACS:
-4670  4671 -4672  16  4673 0
-4670  4671 -4672  16  4674 0
-4670  4671 -4672  16 -4675 0

c  -2-1 --> break 
c    ( b^{2, 8}_2 ∧  b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧ -p_16) -> break
c  in CNF:
c    -b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨  b^{2, 8}_0 ∨  p_16 ∨ break
c  in DIMACS:
-4670 -4671  4672  16 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 8}_2 ∧ -b^{2, 8}_1 ∧ -b^{2, 8}_0 ∧ true) 
c  in CNF:
c    -b^{2, 8}_2 ∨  b^{2, 8}_1 ∨  b^{2, 8}_0 ∨ false 
c  in DIMACS:
-4670  4671  4672  0

c  3 does not represent an automaton state.
c    -(-b^{2, 8}_2 ∧  b^{2, 8}_1 ∧  b^{2, 8}_0 ∧ true) 
c  in CNF:
c     b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ false 
c  in DIMACS:
 4670 -4671 -4672  0
c  -3 does not represent an automaton state.
c    -( b^{2, 8}_2 ∧  b^{2, 8}_1 ∧  b^{2, 8}_0 ∧ true) 
c  in CNF:
c    -b^{2, 8}_2 ∨ -b^{2, 8}_1 ∨ -b^{2, 8}_0 ∨ false 
c  in DIMACS:
-4670 -4671 -4672  0

c i = 9
c  -2+1 --> -1
c    ( b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧  p_18) -> ( b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0)
c  in CNF:
c    -b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨  b^{2, 10}_2
c    -b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_1
c    -b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨  b^{2, 10}_0
c  in DIMACS:
-4673 -4674  4675 -18  4676 0
-4673 -4674  4675 -18 -4677 0
-4673 -4674  4675 -18  4678 0

c  -1+1 --> 0
c    ( b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0 ∧  p_18) -> (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧ -b^{2, 10}_0)
c  in CNF:
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_2
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_1
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_0
c  in DIMACS:
-4673  4674 -4675 -18 -4676 0
-4673  4674 -4675 -18 -4677 0
-4673  4674 -4675 -18 -4678 0

c  0+1 --> 1
c    (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧  p_18) -> (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0)
c  in CNF:
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_2
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_1
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨  b^{2, 10}_0
c  in DIMACS:
 4673  4674  4675 -18 -4676 0
 4673  4674  4675 -18 -4677 0
 4673  4674  4675 -18  4678 0

c  1+1 --> 2
c    (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0 ∧  p_18) -> (-b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0)
c  in CNF:
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_2
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨  b^{2, 10}_1
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ -p_18 ∨ -b^{2, 10}_0
c  in DIMACS:
 4673  4674 -4675 -18 -4676 0
 4673  4674 -4675 -18  4677 0
 4673  4674 -4675 -18 -4678 0

c  2+1 --> break 
c    (-b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧  p_18) -> break
c  in CNF:
c     b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 4673 -4674  4675 -18 1162 0


c  2-1 --> 1
c    (-b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧ -p_18) -> (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0)
c  in CNF:
c     b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_2
c     b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_1
c     b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨  b^{2, 10}_0
c  in DIMACS:
 4673 -4674  4675  18 -4676 0
 4673 -4674  4675  18 -4677 0
 4673 -4674  4675  18  4678 0

c  1-1 --> 0
c    (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0 ∧ -p_18) -> (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧ -b^{2, 10}_0)
c  in CNF:
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_2
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_1
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_0
c  in DIMACS:
 4673  4674 -4675  18 -4676 0
 4673  4674 -4675  18 -4677 0
 4673  4674 -4675  18 -4678 0

c  0-1 --> -1
c    (-b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧ -p_18) -> ( b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0)
c  in CNF:
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨  b^{2, 10}_2
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_1
c     b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨  b^{2, 10}_0
c  in DIMACS:
 4673  4674  4675  18  4676 0
 4673  4674  4675  18 -4677 0
 4673  4674  4675  18  4678 0

c  -1-1 --> -2
c    ( b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧  b^{2, 9}_0 ∧ -p_18) -> ( b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0)
c  in CNF:
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨  b^{2, 10}_2
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨  b^{2, 10}_1
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨  p_18 ∨ -b^{2, 10}_0
c  in DIMACS:
-4673  4674 -4675  18  4676 0
-4673  4674 -4675  18  4677 0
-4673  4674 -4675  18 -4678 0

c  -2-1 --> break 
c    ( b^{2, 9}_2 ∧  b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨  b^{2, 9}_0 ∨  p_18 ∨ break
c  in DIMACS:
-4673 -4674  4675  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 9}_2 ∧ -b^{2, 9}_1 ∧ -b^{2, 9}_0 ∧ true) 
c  in CNF:
c    -b^{2, 9}_2 ∨  b^{2, 9}_1 ∨  b^{2, 9}_0 ∨ false 
c  in DIMACS:
-4673  4674  4675  0

c  3 does not represent an automaton state.
c    -(-b^{2, 9}_2 ∧  b^{2, 9}_1 ∧  b^{2, 9}_0 ∧ true) 
c  in CNF:
c     b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ false 
c  in DIMACS:
 4673 -4674 -4675  0
c  -3 does not represent an automaton state.
c    -( b^{2, 9}_2 ∧  b^{2, 9}_1 ∧  b^{2, 9}_0 ∧ true) 
c  in CNF:
c    -b^{2, 9}_2 ∨ -b^{2, 9}_1 ∨ -b^{2, 9}_0 ∨ false 
c  in DIMACS:
-4673 -4674 -4675  0

c i = 10
c  -2+1 --> -1
c    ( b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧  p_20) -> ( b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0)
c  in CNF:
c    -b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨  b^{2, 11}_2
c    -b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_1
c    -b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨  b^{2, 11}_0
c  in DIMACS:
-4676 -4677  4678 -20  4679 0
-4676 -4677  4678 -20 -4680 0
-4676 -4677  4678 -20  4681 0

c  -1+1 --> 0
c    ( b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0 ∧  p_20) -> (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧ -b^{2, 11}_0)
c  in CNF:
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_2
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_1
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_0
c  in DIMACS:
-4676  4677 -4678 -20 -4679 0
-4676  4677 -4678 -20 -4680 0
-4676  4677 -4678 -20 -4681 0

c  0+1 --> 1
c    (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧  p_20) -> (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0)
c  in CNF:
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_2
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_1
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨  b^{2, 11}_0
c  in DIMACS:
 4676  4677  4678 -20 -4679 0
 4676  4677  4678 -20 -4680 0
 4676  4677  4678 -20  4681 0

c  1+1 --> 2
c    (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0 ∧  p_20) -> (-b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0)
c  in CNF:
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_2
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨  b^{2, 11}_1
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ -p_20 ∨ -b^{2, 11}_0
c  in DIMACS:
 4676  4677 -4678 -20 -4679 0
 4676  4677 -4678 -20  4680 0
 4676  4677 -4678 -20 -4681 0

c  2+1 --> break 
c    (-b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧  p_20) -> break
c  in CNF:
c     b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 4676 -4677  4678 -20 1162 0


c  2-1 --> 1
c    (-b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧ -p_20) -> (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0)
c  in CNF:
c     b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_2
c     b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_1
c     b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨  b^{2, 11}_0
c  in DIMACS:
 4676 -4677  4678  20 -4679 0
 4676 -4677  4678  20 -4680 0
 4676 -4677  4678  20  4681 0

c  1-1 --> 0
c    (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0 ∧ -p_20) -> (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧ -b^{2, 11}_0)
c  in CNF:
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_2
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_1
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_0
c  in DIMACS:
 4676  4677 -4678  20 -4679 0
 4676  4677 -4678  20 -4680 0
 4676  4677 -4678  20 -4681 0

c  0-1 --> -1
c    (-b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧ -p_20) -> ( b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0)
c  in CNF:
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨  b^{2, 11}_2
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_1
c     b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨  b^{2, 11}_0
c  in DIMACS:
 4676  4677  4678  20  4679 0
 4676  4677  4678  20 -4680 0
 4676  4677  4678  20  4681 0

c  -1-1 --> -2
c    ( b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧  b^{2, 10}_0 ∧ -p_20) -> ( b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0)
c  in CNF:
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨  b^{2, 11}_2
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨  b^{2, 11}_1
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨  p_20 ∨ -b^{2, 11}_0
c  in DIMACS:
-4676  4677 -4678  20  4679 0
-4676  4677 -4678  20  4680 0
-4676  4677 -4678  20 -4681 0

c  -2-1 --> break 
c    ( b^{2, 10}_2 ∧  b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨  b^{2, 10}_0 ∨  p_20 ∨ break
c  in DIMACS:
-4676 -4677  4678  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 10}_2 ∧ -b^{2, 10}_1 ∧ -b^{2, 10}_0 ∧ true) 
c  in CNF:
c    -b^{2, 10}_2 ∨  b^{2, 10}_1 ∨  b^{2, 10}_0 ∨ false 
c  in DIMACS:
-4676  4677  4678  0

c  3 does not represent an automaton state.
c    -(-b^{2, 10}_2 ∧  b^{2, 10}_1 ∧  b^{2, 10}_0 ∧ true) 
c  in CNF:
c     b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ false 
c  in DIMACS:
 4676 -4677 -4678  0
c  -3 does not represent an automaton state.
c    -( b^{2, 10}_2 ∧  b^{2, 10}_1 ∧  b^{2, 10}_0 ∧ true) 
c  in CNF:
c    -b^{2, 10}_2 ∨ -b^{2, 10}_1 ∨ -b^{2, 10}_0 ∨ false 
c  in DIMACS:
-4676 -4677 -4678  0

c i = 11
c  -2+1 --> -1
c    ( b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧  p_22) -> ( b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0)
c  in CNF:
c    -b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨  b^{2, 12}_2
c    -b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_1
c    -b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨  b^{2, 12}_0
c  in DIMACS:
-4679 -4680  4681 -22  4682 0
-4679 -4680  4681 -22 -4683 0
-4679 -4680  4681 -22  4684 0

c  -1+1 --> 0
c    ( b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0 ∧  p_22) -> (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧ -b^{2, 12}_0)
c  in CNF:
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_2
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_1
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_0
c  in DIMACS:
-4679  4680 -4681 -22 -4682 0
-4679  4680 -4681 -22 -4683 0
-4679  4680 -4681 -22 -4684 0

c  0+1 --> 1
c    (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧  p_22) -> (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0)
c  in CNF:
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_2
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_1
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨  b^{2, 12}_0
c  in DIMACS:
 4679  4680  4681 -22 -4682 0
 4679  4680  4681 -22 -4683 0
 4679  4680  4681 -22  4684 0

c  1+1 --> 2
c    (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0 ∧  p_22) -> (-b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0)
c  in CNF:
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_2
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨  b^{2, 12}_1
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ -p_22 ∨ -b^{2, 12}_0
c  in DIMACS:
 4679  4680 -4681 -22 -4682 0
 4679  4680 -4681 -22  4683 0
 4679  4680 -4681 -22 -4684 0

c  2+1 --> break 
c    (-b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧  p_22) -> break
c  in CNF:
c     b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ -p_22 ∨ break
c  in DIMACS:
 4679 -4680  4681 -22 1162 0


c  2-1 --> 1
c    (-b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧ -p_22) -> (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0)
c  in CNF:
c     b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_2
c     b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_1
c     b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨  b^{2, 12}_0
c  in DIMACS:
 4679 -4680  4681  22 -4682 0
 4679 -4680  4681  22 -4683 0
 4679 -4680  4681  22  4684 0

c  1-1 --> 0
c    (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0 ∧ -p_22) -> (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧ -b^{2, 12}_0)
c  in CNF:
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_2
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_1
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_0
c  in DIMACS:
 4679  4680 -4681  22 -4682 0
 4679  4680 -4681  22 -4683 0
 4679  4680 -4681  22 -4684 0

c  0-1 --> -1
c    (-b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧ -p_22) -> ( b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0)
c  in CNF:
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨  b^{2, 12}_2
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_1
c     b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨  b^{2, 12}_0
c  in DIMACS:
 4679  4680  4681  22  4682 0
 4679  4680  4681  22 -4683 0
 4679  4680  4681  22  4684 0

c  -1-1 --> -2
c    ( b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧  b^{2, 11}_0 ∧ -p_22) -> ( b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0)
c  in CNF:
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨  b^{2, 12}_2
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨  b^{2, 12}_1
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨  p_22 ∨ -b^{2, 12}_0
c  in DIMACS:
-4679  4680 -4681  22  4682 0
-4679  4680 -4681  22  4683 0
-4679  4680 -4681  22 -4684 0

c  -2-1 --> break 
c    ( b^{2, 11}_2 ∧  b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧ -p_22) -> break
c  in CNF:
c    -b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨  b^{2, 11}_0 ∨  p_22 ∨ break
c  in DIMACS:
-4679 -4680  4681  22 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 11}_2 ∧ -b^{2, 11}_1 ∧ -b^{2, 11}_0 ∧ true) 
c  in CNF:
c    -b^{2, 11}_2 ∨  b^{2, 11}_1 ∨  b^{2, 11}_0 ∨ false 
c  in DIMACS:
-4679  4680  4681  0

c  3 does not represent an automaton state.
c    -(-b^{2, 11}_2 ∧  b^{2, 11}_1 ∧  b^{2, 11}_0 ∧ true) 
c  in CNF:
c     b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ false 
c  in DIMACS:
 4679 -4680 -4681  0
c  -3 does not represent an automaton state.
c    -( b^{2, 11}_2 ∧  b^{2, 11}_1 ∧  b^{2, 11}_0 ∧ true) 
c  in CNF:
c    -b^{2, 11}_2 ∨ -b^{2, 11}_1 ∨ -b^{2, 11}_0 ∨ false 
c  in DIMACS:
-4679 -4680 -4681  0

c i = 12
c  -2+1 --> -1
c    ( b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧  p_24) -> ( b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0)
c  in CNF:
c    -b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨  b^{2, 13}_2
c    -b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_1
c    -b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨  b^{2, 13}_0
c  in DIMACS:
-4682 -4683  4684 -24  4685 0
-4682 -4683  4684 -24 -4686 0
-4682 -4683  4684 -24  4687 0

c  -1+1 --> 0
c    ( b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0 ∧  p_24) -> (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧ -b^{2, 13}_0)
c  in CNF:
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_2
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_1
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_0
c  in DIMACS:
-4682  4683 -4684 -24 -4685 0
-4682  4683 -4684 -24 -4686 0
-4682  4683 -4684 -24 -4687 0

c  0+1 --> 1
c    (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧  p_24) -> (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0)
c  in CNF:
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_2
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_1
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨  b^{2, 13}_0
c  in DIMACS:
 4682  4683  4684 -24 -4685 0
 4682  4683  4684 -24 -4686 0
 4682  4683  4684 -24  4687 0

c  1+1 --> 2
c    (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0 ∧  p_24) -> (-b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0)
c  in CNF:
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_2
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨  b^{2, 13}_1
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ -p_24 ∨ -b^{2, 13}_0
c  in DIMACS:
 4682  4683 -4684 -24 -4685 0
 4682  4683 -4684 -24  4686 0
 4682  4683 -4684 -24 -4687 0

c  2+1 --> break 
c    (-b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧  p_24) -> break
c  in CNF:
c     b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 4682 -4683  4684 -24 1162 0


c  2-1 --> 1
c    (-b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧ -p_24) -> (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0)
c  in CNF:
c     b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_2
c     b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_1
c     b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨  b^{2, 13}_0
c  in DIMACS:
 4682 -4683  4684  24 -4685 0
 4682 -4683  4684  24 -4686 0
 4682 -4683  4684  24  4687 0

c  1-1 --> 0
c    (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0 ∧ -p_24) -> (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧ -b^{2, 13}_0)
c  in CNF:
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_2
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_1
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_0
c  in DIMACS:
 4682  4683 -4684  24 -4685 0
 4682  4683 -4684  24 -4686 0
 4682  4683 -4684  24 -4687 0

c  0-1 --> -1
c    (-b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧ -p_24) -> ( b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0)
c  in CNF:
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨  b^{2, 13}_2
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_1
c     b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨  b^{2, 13}_0
c  in DIMACS:
 4682  4683  4684  24  4685 0
 4682  4683  4684  24 -4686 0
 4682  4683  4684  24  4687 0

c  -1-1 --> -2
c    ( b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧  b^{2, 12}_0 ∧ -p_24) -> ( b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0)
c  in CNF:
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨  b^{2, 13}_2
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨  b^{2, 13}_1
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨  p_24 ∨ -b^{2, 13}_0
c  in DIMACS:
-4682  4683 -4684  24  4685 0
-4682  4683 -4684  24  4686 0
-4682  4683 -4684  24 -4687 0

c  -2-1 --> break 
c    ( b^{2, 12}_2 ∧  b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨  b^{2, 12}_0 ∨  p_24 ∨ break
c  in DIMACS:
-4682 -4683  4684  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 12}_2 ∧ -b^{2, 12}_1 ∧ -b^{2, 12}_0 ∧ true) 
c  in CNF:
c    -b^{2, 12}_2 ∨  b^{2, 12}_1 ∨  b^{2, 12}_0 ∨ false 
c  in DIMACS:
-4682  4683  4684  0

c  3 does not represent an automaton state.
c    -(-b^{2, 12}_2 ∧  b^{2, 12}_1 ∧  b^{2, 12}_0 ∧ true) 
c  in CNF:
c     b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ false 
c  in DIMACS:
 4682 -4683 -4684  0
c  -3 does not represent an automaton state.
c    -( b^{2, 12}_2 ∧  b^{2, 12}_1 ∧  b^{2, 12}_0 ∧ true) 
c  in CNF:
c    -b^{2, 12}_2 ∨ -b^{2, 12}_1 ∨ -b^{2, 12}_0 ∨ false 
c  in DIMACS:
-4682 -4683 -4684  0

c i = 13
c  -2+1 --> -1
c    ( b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧  p_26) -> ( b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0)
c  in CNF:
c    -b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨  b^{2, 14}_2
c    -b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_1
c    -b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨  b^{2, 14}_0
c  in DIMACS:
-4685 -4686  4687 -26  4688 0
-4685 -4686  4687 -26 -4689 0
-4685 -4686  4687 -26  4690 0

c  -1+1 --> 0
c    ( b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0 ∧  p_26) -> (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧ -b^{2, 14}_0)
c  in CNF:
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_2
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_1
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_0
c  in DIMACS:
-4685  4686 -4687 -26 -4688 0
-4685  4686 -4687 -26 -4689 0
-4685  4686 -4687 -26 -4690 0

c  0+1 --> 1
c    (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧  p_26) -> (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0)
c  in CNF:
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_2
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_1
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨  b^{2, 14}_0
c  in DIMACS:
 4685  4686  4687 -26 -4688 0
 4685  4686  4687 -26 -4689 0
 4685  4686  4687 -26  4690 0

c  1+1 --> 2
c    (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0 ∧  p_26) -> (-b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0)
c  in CNF:
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_2
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨  b^{2, 14}_1
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ -p_26 ∨ -b^{2, 14}_0
c  in DIMACS:
 4685  4686 -4687 -26 -4688 0
 4685  4686 -4687 -26  4689 0
 4685  4686 -4687 -26 -4690 0

c  2+1 --> break 
c    (-b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧  p_26) -> break
c  in CNF:
c     b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ -p_26 ∨ break
c  in DIMACS:
 4685 -4686  4687 -26 1162 0


c  2-1 --> 1
c    (-b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧ -p_26) -> (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0)
c  in CNF:
c     b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_2
c     b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_1
c     b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨  b^{2, 14}_0
c  in DIMACS:
 4685 -4686  4687  26 -4688 0
 4685 -4686  4687  26 -4689 0
 4685 -4686  4687  26  4690 0

c  1-1 --> 0
c    (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0 ∧ -p_26) -> (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧ -b^{2, 14}_0)
c  in CNF:
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_2
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_1
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_0
c  in DIMACS:
 4685  4686 -4687  26 -4688 0
 4685  4686 -4687  26 -4689 0
 4685  4686 -4687  26 -4690 0

c  0-1 --> -1
c    (-b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧ -p_26) -> ( b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0)
c  in CNF:
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨  b^{2, 14}_2
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_1
c     b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨  b^{2, 14}_0
c  in DIMACS:
 4685  4686  4687  26  4688 0
 4685  4686  4687  26 -4689 0
 4685  4686  4687  26  4690 0

c  -1-1 --> -2
c    ( b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧  b^{2, 13}_0 ∧ -p_26) -> ( b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0)
c  in CNF:
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨  b^{2, 14}_2
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨  b^{2, 14}_1
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨  p_26 ∨ -b^{2, 14}_0
c  in DIMACS:
-4685  4686 -4687  26  4688 0
-4685  4686 -4687  26  4689 0
-4685  4686 -4687  26 -4690 0

c  -2-1 --> break 
c    ( b^{2, 13}_2 ∧  b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧ -p_26) -> break
c  in CNF:
c    -b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨  b^{2, 13}_0 ∨  p_26 ∨ break
c  in DIMACS:
-4685 -4686  4687  26 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 13}_2 ∧ -b^{2, 13}_1 ∧ -b^{2, 13}_0 ∧ true) 
c  in CNF:
c    -b^{2, 13}_2 ∨  b^{2, 13}_1 ∨  b^{2, 13}_0 ∨ false 
c  in DIMACS:
-4685  4686  4687  0

c  3 does not represent an automaton state.
c    -(-b^{2, 13}_2 ∧  b^{2, 13}_1 ∧  b^{2, 13}_0 ∧ true) 
c  in CNF:
c     b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ false 
c  in DIMACS:
 4685 -4686 -4687  0
c  -3 does not represent an automaton state.
c    -( b^{2, 13}_2 ∧  b^{2, 13}_1 ∧  b^{2, 13}_0 ∧ true) 
c  in CNF:
c    -b^{2, 13}_2 ∨ -b^{2, 13}_1 ∨ -b^{2, 13}_0 ∨ false 
c  in DIMACS:
-4685 -4686 -4687  0

c i = 14
c  -2+1 --> -1
c    ( b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧  p_28) -> ( b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0)
c  in CNF:
c    -b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨  b^{2, 15}_2
c    -b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_1
c    -b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨  b^{2, 15}_0
c  in DIMACS:
-4688 -4689  4690 -28  4691 0
-4688 -4689  4690 -28 -4692 0
-4688 -4689  4690 -28  4693 0

c  -1+1 --> 0
c    ( b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0 ∧  p_28) -> (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧ -b^{2, 15}_0)
c  in CNF:
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_2
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_1
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_0
c  in DIMACS:
-4688  4689 -4690 -28 -4691 0
-4688  4689 -4690 -28 -4692 0
-4688  4689 -4690 -28 -4693 0

c  0+1 --> 1
c    (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧  p_28) -> (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0)
c  in CNF:
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_2
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_1
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨  b^{2, 15}_0
c  in DIMACS:
 4688  4689  4690 -28 -4691 0
 4688  4689  4690 -28 -4692 0
 4688  4689  4690 -28  4693 0

c  1+1 --> 2
c    (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0 ∧  p_28) -> (-b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0)
c  in CNF:
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_2
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨  b^{2, 15}_1
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ -p_28 ∨ -b^{2, 15}_0
c  in DIMACS:
 4688  4689 -4690 -28 -4691 0
 4688  4689 -4690 -28  4692 0
 4688  4689 -4690 -28 -4693 0

c  2+1 --> break 
c    (-b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧  p_28) -> break
c  in CNF:
c     b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 4688 -4689  4690 -28 1162 0


c  2-1 --> 1
c    (-b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧ -p_28) -> (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0)
c  in CNF:
c     b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_2
c     b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_1
c     b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨  b^{2, 15}_0
c  in DIMACS:
 4688 -4689  4690  28 -4691 0
 4688 -4689  4690  28 -4692 0
 4688 -4689  4690  28  4693 0

c  1-1 --> 0
c    (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0 ∧ -p_28) -> (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧ -b^{2, 15}_0)
c  in CNF:
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_2
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_1
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_0
c  in DIMACS:
 4688  4689 -4690  28 -4691 0
 4688  4689 -4690  28 -4692 0
 4688  4689 -4690  28 -4693 0

c  0-1 --> -1
c    (-b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧ -p_28) -> ( b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0)
c  in CNF:
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨  b^{2, 15}_2
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_1
c     b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨  b^{2, 15}_0
c  in DIMACS:
 4688  4689  4690  28  4691 0
 4688  4689  4690  28 -4692 0
 4688  4689  4690  28  4693 0

c  -1-1 --> -2
c    ( b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧  b^{2, 14}_0 ∧ -p_28) -> ( b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0)
c  in CNF:
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨  b^{2, 15}_2
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨  b^{2, 15}_1
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨  p_28 ∨ -b^{2, 15}_0
c  in DIMACS:
-4688  4689 -4690  28  4691 0
-4688  4689 -4690  28  4692 0
-4688  4689 -4690  28 -4693 0

c  -2-1 --> break 
c    ( b^{2, 14}_2 ∧  b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨  b^{2, 14}_0 ∨  p_28 ∨ break
c  in DIMACS:
-4688 -4689  4690  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 14}_2 ∧ -b^{2, 14}_1 ∧ -b^{2, 14}_0 ∧ true) 
c  in CNF:
c    -b^{2, 14}_2 ∨  b^{2, 14}_1 ∨  b^{2, 14}_0 ∨ false 
c  in DIMACS:
-4688  4689  4690  0

c  3 does not represent an automaton state.
c    -(-b^{2, 14}_2 ∧  b^{2, 14}_1 ∧  b^{2, 14}_0 ∧ true) 
c  in CNF:
c     b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ false 
c  in DIMACS:
 4688 -4689 -4690  0
c  -3 does not represent an automaton state.
c    -( b^{2, 14}_2 ∧  b^{2, 14}_1 ∧  b^{2, 14}_0 ∧ true) 
c  in CNF:
c    -b^{2, 14}_2 ∨ -b^{2, 14}_1 ∨ -b^{2, 14}_0 ∨ false 
c  in DIMACS:
-4688 -4689 -4690  0

c i = 15
c  -2+1 --> -1
c    ( b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧  p_30) -> ( b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0)
c  in CNF:
c    -b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨  b^{2, 16}_2
c    -b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_1
c    -b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨  b^{2, 16}_0
c  in DIMACS:
-4691 -4692  4693 -30  4694 0
-4691 -4692  4693 -30 -4695 0
-4691 -4692  4693 -30  4696 0

c  -1+1 --> 0
c    ( b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0 ∧  p_30) -> (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧ -b^{2, 16}_0)
c  in CNF:
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_2
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_1
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_0
c  in DIMACS:
-4691  4692 -4693 -30 -4694 0
-4691  4692 -4693 -30 -4695 0
-4691  4692 -4693 -30 -4696 0

c  0+1 --> 1
c    (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧  p_30) -> (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0)
c  in CNF:
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_2
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_1
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨  b^{2, 16}_0
c  in DIMACS:
 4691  4692  4693 -30 -4694 0
 4691  4692  4693 -30 -4695 0
 4691  4692  4693 -30  4696 0

c  1+1 --> 2
c    (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0 ∧  p_30) -> (-b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0)
c  in CNF:
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_2
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨  b^{2, 16}_1
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ -p_30 ∨ -b^{2, 16}_0
c  in DIMACS:
 4691  4692 -4693 -30 -4694 0
 4691  4692 -4693 -30  4695 0
 4691  4692 -4693 -30 -4696 0

c  2+1 --> break 
c    (-b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧  p_30) -> break
c  in CNF:
c     b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 4691 -4692  4693 -30 1162 0


c  2-1 --> 1
c    (-b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧ -p_30) -> (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0)
c  in CNF:
c     b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_2
c     b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_1
c     b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨  b^{2, 16}_0
c  in DIMACS:
 4691 -4692  4693  30 -4694 0
 4691 -4692  4693  30 -4695 0
 4691 -4692  4693  30  4696 0

c  1-1 --> 0
c    (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0 ∧ -p_30) -> (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧ -b^{2, 16}_0)
c  in CNF:
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_2
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_1
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_0
c  in DIMACS:
 4691  4692 -4693  30 -4694 0
 4691  4692 -4693  30 -4695 0
 4691  4692 -4693  30 -4696 0

c  0-1 --> -1
c    (-b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧ -p_30) -> ( b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0)
c  in CNF:
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨  b^{2, 16}_2
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_1
c     b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨  b^{2, 16}_0
c  in DIMACS:
 4691  4692  4693  30  4694 0
 4691  4692  4693  30 -4695 0
 4691  4692  4693  30  4696 0

c  -1-1 --> -2
c    ( b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧  b^{2, 15}_0 ∧ -p_30) -> ( b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0)
c  in CNF:
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨  b^{2, 16}_2
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨  b^{2, 16}_1
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨  p_30 ∨ -b^{2, 16}_0
c  in DIMACS:
-4691  4692 -4693  30  4694 0
-4691  4692 -4693  30  4695 0
-4691  4692 -4693  30 -4696 0

c  -2-1 --> break 
c    ( b^{2, 15}_2 ∧  b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨  b^{2, 15}_0 ∨  p_30 ∨ break
c  in DIMACS:
-4691 -4692  4693  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 15}_2 ∧ -b^{2, 15}_1 ∧ -b^{2, 15}_0 ∧ true) 
c  in CNF:
c    -b^{2, 15}_2 ∨  b^{2, 15}_1 ∨  b^{2, 15}_0 ∨ false 
c  in DIMACS:
-4691  4692  4693  0

c  3 does not represent an automaton state.
c    -(-b^{2, 15}_2 ∧  b^{2, 15}_1 ∧  b^{2, 15}_0 ∧ true) 
c  in CNF:
c     b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ false 
c  in DIMACS:
 4691 -4692 -4693  0
c  -3 does not represent an automaton state.
c    -( b^{2, 15}_2 ∧  b^{2, 15}_1 ∧  b^{2, 15}_0 ∧ true) 
c  in CNF:
c    -b^{2, 15}_2 ∨ -b^{2, 15}_1 ∨ -b^{2, 15}_0 ∨ false 
c  in DIMACS:
-4691 -4692 -4693  0

c i = 16
c  -2+1 --> -1
c    ( b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧  p_32) -> ( b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0)
c  in CNF:
c    -b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨  b^{2, 17}_2
c    -b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_1
c    -b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨  b^{2, 17}_0
c  in DIMACS:
-4694 -4695  4696 -32  4697 0
-4694 -4695  4696 -32 -4698 0
-4694 -4695  4696 -32  4699 0

c  -1+1 --> 0
c    ( b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0 ∧  p_32) -> (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧ -b^{2, 17}_0)
c  in CNF:
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_2
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_1
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_0
c  in DIMACS:
-4694  4695 -4696 -32 -4697 0
-4694  4695 -4696 -32 -4698 0
-4694  4695 -4696 -32 -4699 0

c  0+1 --> 1
c    (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧  p_32) -> (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0)
c  in CNF:
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_2
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_1
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨  b^{2, 17}_0
c  in DIMACS:
 4694  4695  4696 -32 -4697 0
 4694  4695  4696 -32 -4698 0
 4694  4695  4696 -32  4699 0

c  1+1 --> 2
c    (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0 ∧  p_32) -> (-b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0)
c  in CNF:
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_2
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨  b^{2, 17}_1
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ -p_32 ∨ -b^{2, 17}_0
c  in DIMACS:
 4694  4695 -4696 -32 -4697 0
 4694  4695 -4696 -32  4698 0
 4694  4695 -4696 -32 -4699 0

c  2+1 --> break 
c    (-b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧  p_32) -> break
c  in CNF:
c     b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 4694 -4695  4696 -32 1162 0


c  2-1 --> 1
c    (-b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧ -p_32) -> (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0)
c  in CNF:
c     b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_2
c     b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_1
c     b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨  b^{2, 17}_0
c  in DIMACS:
 4694 -4695  4696  32 -4697 0
 4694 -4695  4696  32 -4698 0
 4694 -4695  4696  32  4699 0

c  1-1 --> 0
c    (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0 ∧ -p_32) -> (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧ -b^{2, 17}_0)
c  in CNF:
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_2
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_1
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_0
c  in DIMACS:
 4694  4695 -4696  32 -4697 0
 4694  4695 -4696  32 -4698 0
 4694  4695 -4696  32 -4699 0

c  0-1 --> -1
c    (-b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧ -p_32) -> ( b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0)
c  in CNF:
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨  b^{2, 17}_2
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_1
c     b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨  b^{2, 17}_0
c  in DIMACS:
 4694  4695  4696  32  4697 0
 4694  4695  4696  32 -4698 0
 4694  4695  4696  32  4699 0

c  -1-1 --> -2
c    ( b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧  b^{2, 16}_0 ∧ -p_32) -> ( b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0)
c  in CNF:
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨  b^{2, 17}_2
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨  b^{2, 17}_1
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨  p_32 ∨ -b^{2, 17}_0
c  in DIMACS:
-4694  4695 -4696  32  4697 0
-4694  4695 -4696  32  4698 0
-4694  4695 -4696  32 -4699 0

c  -2-1 --> break 
c    ( b^{2, 16}_2 ∧  b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨  b^{2, 16}_0 ∨  p_32 ∨ break
c  in DIMACS:
-4694 -4695  4696  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 16}_2 ∧ -b^{2, 16}_1 ∧ -b^{2, 16}_0 ∧ true) 
c  in CNF:
c    -b^{2, 16}_2 ∨  b^{2, 16}_1 ∨  b^{2, 16}_0 ∨ false 
c  in DIMACS:
-4694  4695  4696  0

c  3 does not represent an automaton state.
c    -(-b^{2, 16}_2 ∧  b^{2, 16}_1 ∧  b^{2, 16}_0 ∧ true) 
c  in CNF:
c     b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ false 
c  in DIMACS:
 4694 -4695 -4696  0
c  -3 does not represent an automaton state.
c    -( b^{2, 16}_2 ∧  b^{2, 16}_1 ∧  b^{2, 16}_0 ∧ true) 
c  in CNF:
c    -b^{2, 16}_2 ∨ -b^{2, 16}_1 ∨ -b^{2, 16}_0 ∨ false 
c  in DIMACS:
-4694 -4695 -4696  0

c i = 17
c  -2+1 --> -1
c    ( b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧  p_34) -> ( b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0)
c  in CNF:
c    -b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨  b^{2, 18}_2
c    -b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_1
c    -b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨  b^{2, 18}_0
c  in DIMACS:
-4697 -4698  4699 -34  4700 0
-4697 -4698  4699 -34 -4701 0
-4697 -4698  4699 -34  4702 0

c  -1+1 --> 0
c    ( b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0 ∧  p_34) -> (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧ -b^{2, 18}_0)
c  in CNF:
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_2
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_1
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_0
c  in DIMACS:
-4697  4698 -4699 -34 -4700 0
-4697  4698 -4699 -34 -4701 0
-4697  4698 -4699 -34 -4702 0

c  0+1 --> 1
c    (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧  p_34) -> (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0)
c  in CNF:
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_2
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_1
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨  b^{2, 18}_0
c  in DIMACS:
 4697  4698  4699 -34 -4700 0
 4697  4698  4699 -34 -4701 0
 4697  4698  4699 -34  4702 0

c  1+1 --> 2
c    (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0 ∧  p_34) -> (-b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0)
c  in CNF:
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_2
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨  b^{2, 18}_1
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ -p_34 ∨ -b^{2, 18}_0
c  in DIMACS:
 4697  4698 -4699 -34 -4700 0
 4697  4698 -4699 -34  4701 0
 4697  4698 -4699 -34 -4702 0

c  2+1 --> break 
c    (-b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧  p_34) -> break
c  in CNF:
c     b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ -p_34 ∨ break
c  in DIMACS:
 4697 -4698  4699 -34 1162 0


c  2-1 --> 1
c    (-b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧ -p_34) -> (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0)
c  in CNF:
c     b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_2
c     b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_1
c     b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨  b^{2, 18}_0
c  in DIMACS:
 4697 -4698  4699  34 -4700 0
 4697 -4698  4699  34 -4701 0
 4697 -4698  4699  34  4702 0

c  1-1 --> 0
c    (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0 ∧ -p_34) -> (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧ -b^{2, 18}_0)
c  in CNF:
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_2
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_1
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_0
c  in DIMACS:
 4697  4698 -4699  34 -4700 0
 4697  4698 -4699  34 -4701 0
 4697  4698 -4699  34 -4702 0

c  0-1 --> -1
c    (-b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧ -p_34) -> ( b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0)
c  in CNF:
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨  b^{2, 18}_2
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_1
c     b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨  b^{2, 18}_0
c  in DIMACS:
 4697  4698  4699  34  4700 0
 4697  4698  4699  34 -4701 0
 4697  4698  4699  34  4702 0

c  -1-1 --> -2
c    ( b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧  b^{2, 17}_0 ∧ -p_34) -> ( b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0)
c  in CNF:
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨  b^{2, 18}_2
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨  b^{2, 18}_1
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨  p_34 ∨ -b^{2, 18}_0
c  in DIMACS:
-4697  4698 -4699  34  4700 0
-4697  4698 -4699  34  4701 0
-4697  4698 -4699  34 -4702 0

c  -2-1 --> break 
c    ( b^{2, 17}_2 ∧  b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧ -p_34) -> break
c  in CNF:
c    -b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨  b^{2, 17}_0 ∨  p_34 ∨ break
c  in DIMACS:
-4697 -4698  4699  34 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 17}_2 ∧ -b^{2, 17}_1 ∧ -b^{2, 17}_0 ∧ true) 
c  in CNF:
c    -b^{2, 17}_2 ∨  b^{2, 17}_1 ∨  b^{2, 17}_0 ∨ false 
c  in DIMACS:
-4697  4698  4699  0

c  3 does not represent an automaton state.
c    -(-b^{2, 17}_2 ∧  b^{2, 17}_1 ∧  b^{2, 17}_0 ∧ true) 
c  in CNF:
c     b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ false 
c  in DIMACS:
 4697 -4698 -4699  0
c  -3 does not represent an automaton state.
c    -( b^{2, 17}_2 ∧  b^{2, 17}_1 ∧  b^{2, 17}_0 ∧ true) 
c  in CNF:
c    -b^{2, 17}_2 ∨ -b^{2, 17}_1 ∨ -b^{2, 17}_0 ∨ false 
c  in DIMACS:
-4697 -4698 -4699  0

c i = 18
c  -2+1 --> -1
c    ( b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧  p_36) -> ( b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0)
c  in CNF:
c    -b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨  b^{2, 19}_2
c    -b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_1
c    -b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨  b^{2, 19}_0
c  in DIMACS:
-4700 -4701  4702 -36  4703 0
-4700 -4701  4702 -36 -4704 0
-4700 -4701  4702 -36  4705 0

c  -1+1 --> 0
c    ( b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0 ∧  p_36) -> (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧ -b^{2, 19}_0)
c  in CNF:
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_2
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_1
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_0
c  in DIMACS:
-4700  4701 -4702 -36 -4703 0
-4700  4701 -4702 -36 -4704 0
-4700  4701 -4702 -36 -4705 0

c  0+1 --> 1
c    (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧  p_36) -> (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0)
c  in CNF:
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_2
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_1
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨  b^{2, 19}_0
c  in DIMACS:
 4700  4701  4702 -36 -4703 0
 4700  4701  4702 -36 -4704 0
 4700  4701  4702 -36  4705 0

c  1+1 --> 2
c    (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0 ∧  p_36) -> (-b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0)
c  in CNF:
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_2
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨  b^{2, 19}_1
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ -p_36 ∨ -b^{2, 19}_0
c  in DIMACS:
 4700  4701 -4702 -36 -4703 0
 4700  4701 -4702 -36  4704 0
 4700  4701 -4702 -36 -4705 0

c  2+1 --> break 
c    (-b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧  p_36) -> break
c  in CNF:
c     b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 4700 -4701  4702 -36 1162 0


c  2-1 --> 1
c    (-b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧ -p_36) -> (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0)
c  in CNF:
c     b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_2
c     b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_1
c     b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨  b^{2, 19}_0
c  in DIMACS:
 4700 -4701  4702  36 -4703 0
 4700 -4701  4702  36 -4704 0
 4700 -4701  4702  36  4705 0

c  1-1 --> 0
c    (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0 ∧ -p_36) -> (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧ -b^{2, 19}_0)
c  in CNF:
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_2
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_1
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_0
c  in DIMACS:
 4700  4701 -4702  36 -4703 0
 4700  4701 -4702  36 -4704 0
 4700  4701 -4702  36 -4705 0

c  0-1 --> -1
c    (-b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧ -p_36) -> ( b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0)
c  in CNF:
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨  b^{2, 19}_2
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_1
c     b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨  b^{2, 19}_0
c  in DIMACS:
 4700  4701  4702  36  4703 0
 4700  4701  4702  36 -4704 0
 4700  4701  4702  36  4705 0

c  -1-1 --> -2
c    ( b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧  b^{2, 18}_0 ∧ -p_36) -> ( b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0)
c  in CNF:
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨  b^{2, 19}_2
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨  b^{2, 19}_1
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨  p_36 ∨ -b^{2, 19}_0
c  in DIMACS:
-4700  4701 -4702  36  4703 0
-4700  4701 -4702  36  4704 0
-4700  4701 -4702  36 -4705 0

c  -2-1 --> break 
c    ( b^{2, 18}_2 ∧  b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨  b^{2, 18}_0 ∨  p_36 ∨ break
c  in DIMACS:
-4700 -4701  4702  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 18}_2 ∧ -b^{2, 18}_1 ∧ -b^{2, 18}_0 ∧ true) 
c  in CNF:
c    -b^{2, 18}_2 ∨  b^{2, 18}_1 ∨  b^{2, 18}_0 ∨ false 
c  in DIMACS:
-4700  4701  4702  0

c  3 does not represent an automaton state.
c    -(-b^{2, 18}_2 ∧  b^{2, 18}_1 ∧  b^{2, 18}_0 ∧ true) 
c  in CNF:
c     b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ false 
c  in DIMACS:
 4700 -4701 -4702  0
c  -3 does not represent an automaton state.
c    -( b^{2, 18}_2 ∧  b^{2, 18}_1 ∧  b^{2, 18}_0 ∧ true) 
c  in CNF:
c    -b^{2, 18}_2 ∨ -b^{2, 18}_1 ∨ -b^{2, 18}_0 ∨ false 
c  in DIMACS:
-4700 -4701 -4702  0

c i = 19
c  -2+1 --> -1
c    ( b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧  p_38) -> ( b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0)
c  in CNF:
c    -b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨  b^{2, 20}_2
c    -b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_1
c    -b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨  b^{2, 20}_0
c  in DIMACS:
-4703 -4704  4705 -38  4706 0
-4703 -4704  4705 -38 -4707 0
-4703 -4704  4705 -38  4708 0

c  -1+1 --> 0
c    ( b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0 ∧  p_38) -> (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧ -b^{2, 20}_0)
c  in CNF:
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_2
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_1
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_0
c  in DIMACS:
-4703  4704 -4705 -38 -4706 0
-4703  4704 -4705 -38 -4707 0
-4703  4704 -4705 -38 -4708 0

c  0+1 --> 1
c    (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧  p_38) -> (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0)
c  in CNF:
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_2
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_1
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨  b^{2, 20}_0
c  in DIMACS:
 4703  4704  4705 -38 -4706 0
 4703  4704  4705 -38 -4707 0
 4703  4704  4705 -38  4708 0

c  1+1 --> 2
c    (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0 ∧  p_38) -> (-b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0)
c  in CNF:
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_2
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨  b^{2, 20}_1
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ -p_38 ∨ -b^{2, 20}_0
c  in DIMACS:
 4703  4704 -4705 -38 -4706 0
 4703  4704 -4705 -38  4707 0
 4703  4704 -4705 -38 -4708 0

c  2+1 --> break 
c    (-b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧  p_38) -> break
c  in CNF:
c     b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ -p_38 ∨ break
c  in DIMACS:
 4703 -4704  4705 -38 1162 0


c  2-1 --> 1
c    (-b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧ -p_38) -> (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0)
c  in CNF:
c     b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_2
c     b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_1
c     b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨  b^{2, 20}_0
c  in DIMACS:
 4703 -4704  4705  38 -4706 0
 4703 -4704  4705  38 -4707 0
 4703 -4704  4705  38  4708 0

c  1-1 --> 0
c    (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0 ∧ -p_38) -> (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧ -b^{2, 20}_0)
c  in CNF:
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_2
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_1
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_0
c  in DIMACS:
 4703  4704 -4705  38 -4706 0
 4703  4704 -4705  38 -4707 0
 4703  4704 -4705  38 -4708 0

c  0-1 --> -1
c    (-b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧ -p_38) -> ( b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0)
c  in CNF:
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨  b^{2, 20}_2
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_1
c     b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨  b^{2, 20}_0
c  in DIMACS:
 4703  4704  4705  38  4706 0
 4703  4704  4705  38 -4707 0
 4703  4704  4705  38  4708 0

c  -1-1 --> -2
c    ( b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧  b^{2, 19}_0 ∧ -p_38) -> ( b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0)
c  in CNF:
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨  b^{2, 20}_2
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨  b^{2, 20}_1
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨  p_38 ∨ -b^{2, 20}_0
c  in DIMACS:
-4703  4704 -4705  38  4706 0
-4703  4704 -4705  38  4707 0
-4703  4704 -4705  38 -4708 0

c  -2-1 --> break 
c    ( b^{2, 19}_2 ∧  b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧ -p_38) -> break
c  in CNF:
c    -b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨  b^{2, 19}_0 ∨  p_38 ∨ break
c  in DIMACS:
-4703 -4704  4705  38 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 19}_2 ∧ -b^{2, 19}_1 ∧ -b^{2, 19}_0 ∧ true) 
c  in CNF:
c    -b^{2, 19}_2 ∨  b^{2, 19}_1 ∨  b^{2, 19}_0 ∨ false 
c  in DIMACS:
-4703  4704  4705  0

c  3 does not represent an automaton state.
c    -(-b^{2, 19}_2 ∧  b^{2, 19}_1 ∧  b^{2, 19}_0 ∧ true) 
c  in CNF:
c     b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ false 
c  in DIMACS:
 4703 -4704 -4705  0
c  -3 does not represent an automaton state.
c    -( b^{2, 19}_2 ∧  b^{2, 19}_1 ∧  b^{2, 19}_0 ∧ true) 
c  in CNF:
c    -b^{2, 19}_2 ∨ -b^{2, 19}_1 ∨ -b^{2, 19}_0 ∨ false 
c  in DIMACS:
-4703 -4704 -4705  0

c i = 20
c  -2+1 --> -1
c    ( b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧  p_40) -> ( b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0)
c  in CNF:
c    -b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨  b^{2, 21}_2
c    -b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_1
c    -b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨  b^{2, 21}_0
c  in DIMACS:
-4706 -4707  4708 -40  4709 0
-4706 -4707  4708 -40 -4710 0
-4706 -4707  4708 -40  4711 0

c  -1+1 --> 0
c    ( b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0 ∧  p_40) -> (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧ -b^{2, 21}_0)
c  in CNF:
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_2
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_1
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_0
c  in DIMACS:
-4706  4707 -4708 -40 -4709 0
-4706  4707 -4708 -40 -4710 0
-4706  4707 -4708 -40 -4711 0

c  0+1 --> 1
c    (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧  p_40) -> (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0)
c  in CNF:
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_2
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_1
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨  b^{2, 21}_0
c  in DIMACS:
 4706  4707  4708 -40 -4709 0
 4706  4707  4708 -40 -4710 0
 4706  4707  4708 -40  4711 0

c  1+1 --> 2
c    (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0 ∧  p_40) -> (-b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0)
c  in CNF:
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_2
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨  b^{2, 21}_1
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ -p_40 ∨ -b^{2, 21}_0
c  in DIMACS:
 4706  4707 -4708 -40 -4709 0
 4706  4707 -4708 -40  4710 0
 4706  4707 -4708 -40 -4711 0

c  2+1 --> break 
c    (-b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧  p_40) -> break
c  in CNF:
c     b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 4706 -4707  4708 -40 1162 0


c  2-1 --> 1
c    (-b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧ -p_40) -> (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0)
c  in CNF:
c     b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_2
c     b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_1
c     b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨  b^{2, 21}_0
c  in DIMACS:
 4706 -4707  4708  40 -4709 0
 4706 -4707  4708  40 -4710 0
 4706 -4707  4708  40  4711 0

c  1-1 --> 0
c    (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0 ∧ -p_40) -> (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧ -b^{2, 21}_0)
c  in CNF:
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_2
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_1
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_0
c  in DIMACS:
 4706  4707 -4708  40 -4709 0
 4706  4707 -4708  40 -4710 0
 4706  4707 -4708  40 -4711 0

c  0-1 --> -1
c    (-b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧ -p_40) -> ( b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0)
c  in CNF:
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨  b^{2, 21}_2
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_1
c     b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨  b^{2, 21}_0
c  in DIMACS:
 4706  4707  4708  40  4709 0
 4706  4707  4708  40 -4710 0
 4706  4707  4708  40  4711 0

c  -1-1 --> -2
c    ( b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧  b^{2, 20}_0 ∧ -p_40) -> ( b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0)
c  in CNF:
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨  b^{2, 21}_2
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨  b^{2, 21}_1
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨  p_40 ∨ -b^{2, 21}_0
c  in DIMACS:
-4706  4707 -4708  40  4709 0
-4706  4707 -4708  40  4710 0
-4706  4707 -4708  40 -4711 0

c  -2-1 --> break 
c    ( b^{2, 20}_2 ∧  b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨  b^{2, 20}_0 ∨  p_40 ∨ break
c  in DIMACS:
-4706 -4707  4708  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 20}_2 ∧ -b^{2, 20}_1 ∧ -b^{2, 20}_0 ∧ true) 
c  in CNF:
c    -b^{2, 20}_2 ∨  b^{2, 20}_1 ∨  b^{2, 20}_0 ∨ false 
c  in DIMACS:
-4706  4707  4708  0

c  3 does not represent an automaton state.
c    -(-b^{2, 20}_2 ∧  b^{2, 20}_1 ∧  b^{2, 20}_0 ∧ true) 
c  in CNF:
c     b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ false 
c  in DIMACS:
 4706 -4707 -4708  0
c  -3 does not represent an automaton state.
c    -( b^{2, 20}_2 ∧  b^{2, 20}_1 ∧  b^{2, 20}_0 ∧ true) 
c  in CNF:
c    -b^{2, 20}_2 ∨ -b^{2, 20}_1 ∨ -b^{2, 20}_0 ∨ false 
c  in DIMACS:
-4706 -4707 -4708  0

c i = 21
c  -2+1 --> -1
c    ( b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧  p_42) -> ( b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0)
c  in CNF:
c    -b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨  b^{2, 22}_2
c    -b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_1
c    -b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨  b^{2, 22}_0
c  in DIMACS:
-4709 -4710  4711 -42  4712 0
-4709 -4710  4711 -42 -4713 0
-4709 -4710  4711 -42  4714 0

c  -1+1 --> 0
c    ( b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0 ∧  p_42) -> (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧ -b^{2, 22}_0)
c  in CNF:
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_2
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_1
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_0
c  in DIMACS:
-4709  4710 -4711 -42 -4712 0
-4709  4710 -4711 -42 -4713 0
-4709  4710 -4711 -42 -4714 0

c  0+1 --> 1
c    (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧  p_42) -> (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0)
c  in CNF:
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_2
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_1
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨  b^{2, 22}_0
c  in DIMACS:
 4709  4710  4711 -42 -4712 0
 4709  4710  4711 -42 -4713 0
 4709  4710  4711 -42  4714 0

c  1+1 --> 2
c    (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0 ∧  p_42) -> (-b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0)
c  in CNF:
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_2
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨  b^{2, 22}_1
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ -p_42 ∨ -b^{2, 22}_0
c  in DIMACS:
 4709  4710 -4711 -42 -4712 0
 4709  4710 -4711 -42  4713 0
 4709  4710 -4711 -42 -4714 0

c  2+1 --> break 
c    (-b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧  p_42) -> break
c  in CNF:
c     b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 4709 -4710  4711 -42 1162 0


c  2-1 --> 1
c    (-b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧ -p_42) -> (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0)
c  in CNF:
c     b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_2
c     b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_1
c     b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨  b^{2, 22}_0
c  in DIMACS:
 4709 -4710  4711  42 -4712 0
 4709 -4710  4711  42 -4713 0
 4709 -4710  4711  42  4714 0

c  1-1 --> 0
c    (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0 ∧ -p_42) -> (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧ -b^{2, 22}_0)
c  in CNF:
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_2
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_1
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_0
c  in DIMACS:
 4709  4710 -4711  42 -4712 0
 4709  4710 -4711  42 -4713 0
 4709  4710 -4711  42 -4714 0

c  0-1 --> -1
c    (-b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧ -p_42) -> ( b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0)
c  in CNF:
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨  b^{2, 22}_2
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_1
c     b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨  b^{2, 22}_0
c  in DIMACS:
 4709  4710  4711  42  4712 0
 4709  4710  4711  42 -4713 0
 4709  4710  4711  42  4714 0

c  -1-1 --> -2
c    ( b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧  b^{2, 21}_0 ∧ -p_42) -> ( b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0)
c  in CNF:
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨  b^{2, 22}_2
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨  b^{2, 22}_1
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨  p_42 ∨ -b^{2, 22}_0
c  in DIMACS:
-4709  4710 -4711  42  4712 0
-4709  4710 -4711  42  4713 0
-4709  4710 -4711  42 -4714 0

c  -2-1 --> break 
c    ( b^{2, 21}_2 ∧  b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨  b^{2, 21}_0 ∨  p_42 ∨ break
c  in DIMACS:
-4709 -4710  4711  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 21}_2 ∧ -b^{2, 21}_1 ∧ -b^{2, 21}_0 ∧ true) 
c  in CNF:
c    -b^{2, 21}_2 ∨  b^{2, 21}_1 ∨  b^{2, 21}_0 ∨ false 
c  in DIMACS:
-4709  4710  4711  0

c  3 does not represent an automaton state.
c    -(-b^{2, 21}_2 ∧  b^{2, 21}_1 ∧  b^{2, 21}_0 ∧ true) 
c  in CNF:
c     b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ false 
c  in DIMACS:
 4709 -4710 -4711  0
c  -3 does not represent an automaton state.
c    -( b^{2, 21}_2 ∧  b^{2, 21}_1 ∧  b^{2, 21}_0 ∧ true) 
c  in CNF:
c    -b^{2, 21}_2 ∨ -b^{2, 21}_1 ∨ -b^{2, 21}_0 ∨ false 
c  in DIMACS:
-4709 -4710 -4711  0

c i = 22
c  -2+1 --> -1
c    ( b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧  p_44) -> ( b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0)
c  in CNF:
c    -b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨  b^{2, 23}_2
c    -b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_1
c    -b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨  b^{2, 23}_0
c  in DIMACS:
-4712 -4713  4714 -44  4715 0
-4712 -4713  4714 -44 -4716 0
-4712 -4713  4714 -44  4717 0

c  -1+1 --> 0
c    ( b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0 ∧  p_44) -> (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧ -b^{2, 23}_0)
c  in CNF:
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_2
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_1
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_0
c  in DIMACS:
-4712  4713 -4714 -44 -4715 0
-4712  4713 -4714 -44 -4716 0
-4712  4713 -4714 -44 -4717 0

c  0+1 --> 1
c    (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧  p_44) -> (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0)
c  in CNF:
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_2
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_1
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨  b^{2, 23}_0
c  in DIMACS:
 4712  4713  4714 -44 -4715 0
 4712  4713  4714 -44 -4716 0
 4712  4713  4714 -44  4717 0

c  1+1 --> 2
c    (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0 ∧  p_44) -> (-b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0)
c  in CNF:
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_2
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨  b^{2, 23}_1
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ -p_44 ∨ -b^{2, 23}_0
c  in DIMACS:
 4712  4713 -4714 -44 -4715 0
 4712  4713 -4714 -44  4716 0
 4712  4713 -4714 -44 -4717 0

c  2+1 --> break 
c    (-b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧  p_44) -> break
c  in CNF:
c     b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 4712 -4713  4714 -44 1162 0


c  2-1 --> 1
c    (-b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧ -p_44) -> (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0)
c  in CNF:
c     b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_2
c     b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_1
c     b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨  b^{2, 23}_0
c  in DIMACS:
 4712 -4713  4714  44 -4715 0
 4712 -4713  4714  44 -4716 0
 4712 -4713  4714  44  4717 0

c  1-1 --> 0
c    (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0 ∧ -p_44) -> (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧ -b^{2, 23}_0)
c  in CNF:
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_2
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_1
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_0
c  in DIMACS:
 4712  4713 -4714  44 -4715 0
 4712  4713 -4714  44 -4716 0
 4712  4713 -4714  44 -4717 0

c  0-1 --> -1
c    (-b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧ -p_44) -> ( b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0)
c  in CNF:
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨  b^{2, 23}_2
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_1
c     b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨  b^{2, 23}_0
c  in DIMACS:
 4712  4713  4714  44  4715 0
 4712  4713  4714  44 -4716 0
 4712  4713  4714  44  4717 0

c  -1-1 --> -2
c    ( b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧  b^{2, 22}_0 ∧ -p_44) -> ( b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0)
c  in CNF:
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨  b^{2, 23}_2
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨  b^{2, 23}_1
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨  p_44 ∨ -b^{2, 23}_0
c  in DIMACS:
-4712  4713 -4714  44  4715 0
-4712  4713 -4714  44  4716 0
-4712  4713 -4714  44 -4717 0

c  -2-1 --> break 
c    ( b^{2, 22}_2 ∧  b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨  b^{2, 22}_0 ∨  p_44 ∨ break
c  in DIMACS:
-4712 -4713  4714  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 22}_2 ∧ -b^{2, 22}_1 ∧ -b^{2, 22}_0 ∧ true) 
c  in CNF:
c    -b^{2, 22}_2 ∨  b^{2, 22}_1 ∨  b^{2, 22}_0 ∨ false 
c  in DIMACS:
-4712  4713  4714  0

c  3 does not represent an automaton state.
c    -(-b^{2, 22}_2 ∧  b^{2, 22}_1 ∧  b^{2, 22}_0 ∧ true) 
c  in CNF:
c     b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ false 
c  in DIMACS:
 4712 -4713 -4714  0
c  -3 does not represent an automaton state.
c    -( b^{2, 22}_2 ∧  b^{2, 22}_1 ∧  b^{2, 22}_0 ∧ true) 
c  in CNF:
c    -b^{2, 22}_2 ∨ -b^{2, 22}_1 ∨ -b^{2, 22}_0 ∨ false 
c  in DIMACS:
-4712 -4713 -4714  0

c i = 23
c  -2+1 --> -1
c    ( b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧  p_46) -> ( b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0)
c  in CNF:
c    -b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨  b^{2, 24}_2
c    -b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_1
c    -b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨  b^{2, 24}_0
c  in DIMACS:
-4715 -4716  4717 -46  4718 0
-4715 -4716  4717 -46 -4719 0
-4715 -4716  4717 -46  4720 0

c  -1+1 --> 0
c    ( b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0 ∧  p_46) -> (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧ -b^{2, 24}_0)
c  in CNF:
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_2
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_1
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_0
c  in DIMACS:
-4715  4716 -4717 -46 -4718 0
-4715  4716 -4717 -46 -4719 0
-4715  4716 -4717 -46 -4720 0

c  0+1 --> 1
c    (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧  p_46) -> (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0)
c  in CNF:
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_2
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_1
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨  b^{2, 24}_0
c  in DIMACS:
 4715  4716  4717 -46 -4718 0
 4715  4716  4717 -46 -4719 0
 4715  4716  4717 -46  4720 0

c  1+1 --> 2
c    (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0 ∧  p_46) -> (-b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0)
c  in CNF:
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_2
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨  b^{2, 24}_1
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ -p_46 ∨ -b^{2, 24}_0
c  in DIMACS:
 4715  4716 -4717 -46 -4718 0
 4715  4716 -4717 -46  4719 0
 4715  4716 -4717 -46 -4720 0

c  2+1 --> break 
c    (-b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧  p_46) -> break
c  in CNF:
c     b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ -p_46 ∨ break
c  in DIMACS:
 4715 -4716  4717 -46 1162 0


c  2-1 --> 1
c    (-b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧ -p_46) -> (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0)
c  in CNF:
c     b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_2
c     b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_1
c     b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨  b^{2, 24}_0
c  in DIMACS:
 4715 -4716  4717  46 -4718 0
 4715 -4716  4717  46 -4719 0
 4715 -4716  4717  46  4720 0

c  1-1 --> 0
c    (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0 ∧ -p_46) -> (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧ -b^{2, 24}_0)
c  in CNF:
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_2
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_1
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_0
c  in DIMACS:
 4715  4716 -4717  46 -4718 0
 4715  4716 -4717  46 -4719 0
 4715  4716 -4717  46 -4720 0

c  0-1 --> -1
c    (-b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧ -p_46) -> ( b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0)
c  in CNF:
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨  b^{2, 24}_2
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_1
c     b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨  b^{2, 24}_0
c  in DIMACS:
 4715  4716  4717  46  4718 0
 4715  4716  4717  46 -4719 0
 4715  4716  4717  46  4720 0

c  -1-1 --> -2
c    ( b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧  b^{2, 23}_0 ∧ -p_46) -> ( b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0)
c  in CNF:
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨  b^{2, 24}_2
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨  b^{2, 24}_1
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨  p_46 ∨ -b^{2, 24}_0
c  in DIMACS:
-4715  4716 -4717  46  4718 0
-4715  4716 -4717  46  4719 0
-4715  4716 -4717  46 -4720 0

c  -2-1 --> break 
c    ( b^{2, 23}_2 ∧  b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧ -p_46) -> break
c  in CNF:
c    -b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨  b^{2, 23}_0 ∨  p_46 ∨ break
c  in DIMACS:
-4715 -4716  4717  46 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 23}_2 ∧ -b^{2, 23}_1 ∧ -b^{2, 23}_0 ∧ true) 
c  in CNF:
c    -b^{2, 23}_2 ∨  b^{2, 23}_1 ∨  b^{2, 23}_0 ∨ false 
c  in DIMACS:
-4715  4716  4717  0

c  3 does not represent an automaton state.
c    -(-b^{2, 23}_2 ∧  b^{2, 23}_1 ∧  b^{2, 23}_0 ∧ true) 
c  in CNF:
c     b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ false 
c  in DIMACS:
 4715 -4716 -4717  0
c  -3 does not represent an automaton state.
c    -( b^{2, 23}_2 ∧  b^{2, 23}_1 ∧  b^{2, 23}_0 ∧ true) 
c  in CNF:
c    -b^{2, 23}_2 ∨ -b^{2, 23}_1 ∨ -b^{2, 23}_0 ∨ false 
c  in DIMACS:
-4715 -4716 -4717  0

c i = 24
c  -2+1 --> -1
c    ( b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧  p_48) -> ( b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0)
c  in CNF:
c    -b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨  b^{2, 25}_2
c    -b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_1
c    -b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨  b^{2, 25}_0
c  in DIMACS:
-4718 -4719  4720 -48  4721 0
-4718 -4719  4720 -48 -4722 0
-4718 -4719  4720 -48  4723 0

c  -1+1 --> 0
c    ( b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0 ∧  p_48) -> (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧ -b^{2, 25}_0)
c  in CNF:
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_2
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_1
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_0
c  in DIMACS:
-4718  4719 -4720 -48 -4721 0
-4718  4719 -4720 -48 -4722 0
-4718  4719 -4720 -48 -4723 0

c  0+1 --> 1
c    (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧  p_48) -> (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0)
c  in CNF:
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_2
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_1
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨  b^{2, 25}_0
c  in DIMACS:
 4718  4719  4720 -48 -4721 0
 4718  4719  4720 -48 -4722 0
 4718  4719  4720 -48  4723 0

c  1+1 --> 2
c    (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0 ∧  p_48) -> (-b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0)
c  in CNF:
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_2
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨  b^{2, 25}_1
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ -p_48 ∨ -b^{2, 25}_0
c  in DIMACS:
 4718  4719 -4720 -48 -4721 0
 4718  4719 -4720 -48  4722 0
 4718  4719 -4720 -48 -4723 0

c  2+1 --> break 
c    (-b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧  p_48) -> break
c  in CNF:
c     b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 4718 -4719  4720 -48 1162 0


c  2-1 --> 1
c    (-b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧ -p_48) -> (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0)
c  in CNF:
c     b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_2
c     b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_1
c     b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨  b^{2, 25}_0
c  in DIMACS:
 4718 -4719  4720  48 -4721 0
 4718 -4719  4720  48 -4722 0
 4718 -4719  4720  48  4723 0

c  1-1 --> 0
c    (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0 ∧ -p_48) -> (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧ -b^{2, 25}_0)
c  in CNF:
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_2
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_1
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_0
c  in DIMACS:
 4718  4719 -4720  48 -4721 0
 4718  4719 -4720  48 -4722 0
 4718  4719 -4720  48 -4723 0

c  0-1 --> -1
c    (-b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧ -p_48) -> ( b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0)
c  in CNF:
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨  b^{2, 25}_2
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_1
c     b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨  b^{2, 25}_0
c  in DIMACS:
 4718  4719  4720  48  4721 0
 4718  4719  4720  48 -4722 0
 4718  4719  4720  48  4723 0

c  -1-1 --> -2
c    ( b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧  b^{2, 24}_0 ∧ -p_48) -> ( b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0)
c  in CNF:
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨  b^{2, 25}_2
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨  b^{2, 25}_1
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨  p_48 ∨ -b^{2, 25}_0
c  in DIMACS:
-4718  4719 -4720  48  4721 0
-4718  4719 -4720  48  4722 0
-4718  4719 -4720  48 -4723 0

c  -2-1 --> break 
c    ( b^{2, 24}_2 ∧  b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨  b^{2, 24}_0 ∨  p_48 ∨ break
c  in DIMACS:
-4718 -4719  4720  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 24}_2 ∧ -b^{2, 24}_1 ∧ -b^{2, 24}_0 ∧ true) 
c  in CNF:
c    -b^{2, 24}_2 ∨  b^{2, 24}_1 ∨  b^{2, 24}_0 ∨ false 
c  in DIMACS:
-4718  4719  4720  0

c  3 does not represent an automaton state.
c    -(-b^{2, 24}_2 ∧  b^{2, 24}_1 ∧  b^{2, 24}_0 ∧ true) 
c  in CNF:
c     b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ false 
c  in DIMACS:
 4718 -4719 -4720  0
c  -3 does not represent an automaton state.
c    -( b^{2, 24}_2 ∧  b^{2, 24}_1 ∧  b^{2, 24}_0 ∧ true) 
c  in CNF:
c    -b^{2, 24}_2 ∨ -b^{2, 24}_1 ∨ -b^{2, 24}_0 ∨ false 
c  in DIMACS:
-4718 -4719 -4720  0

c i = 25
c  -2+1 --> -1
c    ( b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧  p_50) -> ( b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0)
c  in CNF:
c    -b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨  b^{2, 26}_2
c    -b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_1
c    -b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨  b^{2, 26}_0
c  in DIMACS:
-4721 -4722  4723 -50  4724 0
-4721 -4722  4723 -50 -4725 0
-4721 -4722  4723 -50  4726 0

c  -1+1 --> 0
c    ( b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0 ∧  p_50) -> (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧ -b^{2, 26}_0)
c  in CNF:
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_2
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_1
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_0
c  in DIMACS:
-4721  4722 -4723 -50 -4724 0
-4721  4722 -4723 -50 -4725 0
-4721  4722 -4723 -50 -4726 0

c  0+1 --> 1
c    (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧  p_50) -> (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0)
c  in CNF:
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_2
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_1
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨  b^{2, 26}_0
c  in DIMACS:
 4721  4722  4723 -50 -4724 0
 4721  4722  4723 -50 -4725 0
 4721  4722  4723 -50  4726 0

c  1+1 --> 2
c    (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0 ∧  p_50) -> (-b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0)
c  in CNF:
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_2
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨  b^{2, 26}_1
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ -p_50 ∨ -b^{2, 26}_0
c  in DIMACS:
 4721  4722 -4723 -50 -4724 0
 4721  4722 -4723 -50  4725 0
 4721  4722 -4723 -50 -4726 0

c  2+1 --> break 
c    (-b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧  p_50) -> break
c  in CNF:
c     b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 4721 -4722  4723 -50 1162 0


c  2-1 --> 1
c    (-b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧ -p_50) -> (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0)
c  in CNF:
c     b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_2
c     b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_1
c     b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨  b^{2, 26}_0
c  in DIMACS:
 4721 -4722  4723  50 -4724 0
 4721 -4722  4723  50 -4725 0
 4721 -4722  4723  50  4726 0

c  1-1 --> 0
c    (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0 ∧ -p_50) -> (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧ -b^{2, 26}_0)
c  in CNF:
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_2
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_1
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_0
c  in DIMACS:
 4721  4722 -4723  50 -4724 0
 4721  4722 -4723  50 -4725 0
 4721  4722 -4723  50 -4726 0

c  0-1 --> -1
c    (-b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧ -p_50) -> ( b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0)
c  in CNF:
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨  b^{2, 26}_2
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_1
c     b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨  b^{2, 26}_0
c  in DIMACS:
 4721  4722  4723  50  4724 0
 4721  4722  4723  50 -4725 0
 4721  4722  4723  50  4726 0

c  -1-1 --> -2
c    ( b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧  b^{2, 25}_0 ∧ -p_50) -> ( b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0)
c  in CNF:
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨  b^{2, 26}_2
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨  b^{2, 26}_1
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨  p_50 ∨ -b^{2, 26}_0
c  in DIMACS:
-4721  4722 -4723  50  4724 0
-4721  4722 -4723  50  4725 0
-4721  4722 -4723  50 -4726 0

c  -2-1 --> break 
c    ( b^{2, 25}_2 ∧  b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨  b^{2, 25}_0 ∨  p_50 ∨ break
c  in DIMACS:
-4721 -4722  4723  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 25}_2 ∧ -b^{2, 25}_1 ∧ -b^{2, 25}_0 ∧ true) 
c  in CNF:
c    -b^{2, 25}_2 ∨  b^{2, 25}_1 ∨  b^{2, 25}_0 ∨ false 
c  in DIMACS:
-4721  4722  4723  0

c  3 does not represent an automaton state.
c    -(-b^{2, 25}_2 ∧  b^{2, 25}_1 ∧  b^{2, 25}_0 ∧ true) 
c  in CNF:
c     b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ false 
c  in DIMACS:
 4721 -4722 -4723  0
c  -3 does not represent an automaton state.
c    -( b^{2, 25}_2 ∧  b^{2, 25}_1 ∧  b^{2, 25}_0 ∧ true) 
c  in CNF:
c    -b^{2, 25}_2 ∨ -b^{2, 25}_1 ∨ -b^{2, 25}_0 ∨ false 
c  in DIMACS:
-4721 -4722 -4723  0

c i = 26
c  -2+1 --> -1
c    ( b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧  p_52) -> ( b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0)
c  in CNF:
c    -b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨  b^{2, 27}_2
c    -b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_1
c    -b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨  b^{2, 27}_0
c  in DIMACS:
-4724 -4725  4726 -52  4727 0
-4724 -4725  4726 -52 -4728 0
-4724 -4725  4726 -52  4729 0

c  -1+1 --> 0
c    ( b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0 ∧  p_52) -> (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧ -b^{2, 27}_0)
c  in CNF:
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_2
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_1
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_0
c  in DIMACS:
-4724  4725 -4726 -52 -4727 0
-4724  4725 -4726 -52 -4728 0
-4724  4725 -4726 -52 -4729 0

c  0+1 --> 1
c    (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧  p_52) -> (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0)
c  in CNF:
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_2
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_1
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨  b^{2, 27}_0
c  in DIMACS:
 4724  4725  4726 -52 -4727 0
 4724  4725  4726 -52 -4728 0
 4724  4725  4726 -52  4729 0

c  1+1 --> 2
c    (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0 ∧  p_52) -> (-b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0)
c  in CNF:
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_2
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨  b^{2, 27}_1
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ -p_52 ∨ -b^{2, 27}_0
c  in DIMACS:
 4724  4725 -4726 -52 -4727 0
 4724  4725 -4726 -52  4728 0
 4724  4725 -4726 -52 -4729 0

c  2+1 --> break 
c    (-b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧  p_52) -> break
c  in CNF:
c     b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 4724 -4725  4726 -52 1162 0


c  2-1 --> 1
c    (-b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧ -p_52) -> (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0)
c  in CNF:
c     b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_2
c     b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_1
c     b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨  b^{2, 27}_0
c  in DIMACS:
 4724 -4725  4726  52 -4727 0
 4724 -4725  4726  52 -4728 0
 4724 -4725  4726  52  4729 0

c  1-1 --> 0
c    (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0 ∧ -p_52) -> (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧ -b^{2, 27}_0)
c  in CNF:
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_2
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_1
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_0
c  in DIMACS:
 4724  4725 -4726  52 -4727 0
 4724  4725 -4726  52 -4728 0
 4724  4725 -4726  52 -4729 0

c  0-1 --> -1
c    (-b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧ -p_52) -> ( b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0)
c  in CNF:
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨  b^{2, 27}_2
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_1
c     b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨  b^{2, 27}_0
c  in DIMACS:
 4724  4725  4726  52  4727 0
 4724  4725  4726  52 -4728 0
 4724  4725  4726  52  4729 0

c  -1-1 --> -2
c    ( b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧  b^{2, 26}_0 ∧ -p_52) -> ( b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0)
c  in CNF:
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨  b^{2, 27}_2
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨  b^{2, 27}_1
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨  p_52 ∨ -b^{2, 27}_0
c  in DIMACS:
-4724  4725 -4726  52  4727 0
-4724  4725 -4726  52  4728 0
-4724  4725 -4726  52 -4729 0

c  -2-1 --> break 
c    ( b^{2, 26}_2 ∧  b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨  b^{2, 26}_0 ∨  p_52 ∨ break
c  in DIMACS:
-4724 -4725  4726  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 26}_2 ∧ -b^{2, 26}_1 ∧ -b^{2, 26}_0 ∧ true) 
c  in CNF:
c    -b^{2, 26}_2 ∨  b^{2, 26}_1 ∨  b^{2, 26}_0 ∨ false 
c  in DIMACS:
-4724  4725  4726  0

c  3 does not represent an automaton state.
c    -(-b^{2, 26}_2 ∧  b^{2, 26}_1 ∧  b^{2, 26}_0 ∧ true) 
c  in CNF:
c     b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ false 
c  in DIMACS:
 4724 -4725 -4726  0
c  -3 does not represent an automaton state.
c    -( b^{2, 26}_2 ∧  b^{2, 26}_1 ∧  b^{2, 26}_0 ∧ true) 
c  in CNF:
c    -b^{2, 26}_2 ∨ -b^{2, 26}_1 ∨ -b^{2, 26}_0 ∨ false 
c  in DIMACS:
-4724 -4725 -4726  0

c i = 27
c  -2+1 --> -1
c    ( b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧  p_54) -> ( b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0)
c  in CNF:
c    -b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨  b^{2, 28}_2
c    -b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_1
c    -b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨  b^{2, 28}_0
c  in DIMACS:
-4727 -4728  4729 -54  4730 0
-4727 -4728  4729 -54 -4731 0
-4727 -4728  4729 -54  4732 0

c  -1+1 --> 0
c    ( b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0 ∧  p_54) -> (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧ -b^{2, 28}_0)
c  in CNF:
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_2
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_1
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_0
c  in DIMACS:
-4727  4728 -4729 -54 -4730 0
-4727  4728 -4729 -54 -4731 0
-4727  4728 -4729 -54 -4732 0

c  0+1 --> 1
c    (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧  p_54) -> (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0)
c  in CNF:
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_2
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_1
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨  b^{2, 28}_0
c  in DIMACS:
 4727  4728  4729 -54 -4730 0
 4727  4728  4729 -54 -4731 0
 4727  4728  4729 -54  4732 0

c  1+1 --> 2
c    (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0 ∧  p_54) -> (-b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0)
c  in CNF:
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_2
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨  b^{2, 28}_1
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ -p_54 ∨ -b^{2, 28}_0
c  in DIMACS:
 4727  4728 -4729 -54 -4730 0
 4727  4728 -4729 -54  4731 0
 4727  4728 -4729 -54 -4732 0

c  2+1 --> break 
c    (-b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧  p_54) -> break
c  in CNF:
c     b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 4727 -4728  4729 -54 1162 0


c  2-1 --> 1
c    (-b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧ -p_54) -> (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0)
c  in CNF:
c     b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_2
c     b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_1
c     b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨  b^{2, 28}_0
c  in DIMACS:
 4727 -4728  4729  54 -4730 0
 4727 -4728  4729  54 -4731 0
 4727 -4728  4729  54  4732 0

c  1-1 --> 0
c    (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0 ∧ -p_54) -> (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧ -b^{2, 28}_0)
c  in CNF:
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_2
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_1
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_0
c  in DIMACS:
 4727  4728 -4729  54 -4730 0
 4727  4728 -4729  54 -4731 0
 4727  4728 -4729  54 -4732 0

c  0-1 --> -1
c    (-b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧ -p_54) -> ( b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0)
c  in CNF:
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨  b^{2, 28}_2
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_1
c     b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨  b^{2, 28}_0
c  in DIMACS:
 4727  4728  4729  54  4730 0
 4727  4728  4729  54 -4731 0
 4727  4728  4729  54  4732 0

c  -1-1 --> -2
c    ( b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧  b^{2, 27}_0 ∧ -p_54) -> ( b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0)
c  in CNF:
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨  b^{2, 28}_2
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨  b^{2, 28}_1
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨  p_54 ∨ -b^{2, 28}_0
c  in DIMACS:
-4727  4728 -4729  54  4730 0
-4727  4728 -4729  54  4731 0
-4727  4728 -4729  54 -4732 0

c  -2-1 --> break 
c    ( b^{2, 27}_2 ∧  b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨  b^{2, 27}_0 ∨  p_54 ∨ break
c  in DIMACS:
-4727 -4728  4729  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 27}_2 ∧ -b^{2, 27}_1 ∧ -b^{2, 27}_0 ∧ true) 
c  in CNF:
c    -b^{2, 27}_2 ∨  b^{2, 27}_1 ∨  b^{2, 27}_0 ∨ false 
c  in DIMACS:
-4727  4728  4729  0

c  3 does not represent an automaton state.
c    -(-b^{2, 27}_2 ∧  b^{2, 27}_1 ∧  b^{2, 27}_0 ∧ true) 
c  in CNF:
c     b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ false 
c  in DIMACS:
 4727 -4728 -4729  0
c  -3 does not represent an automaton state.
c    -( b^{2, 27}_2 ∧  b^{2, 27}_1 ∧  b^{2, 27}_0 ∧ true) 
c  in CNF:
c    -b^{2, 27}_2 ∨ -b^{2, 27}_1 ∨ -b^{2, 27}_0 ∨ false 
c  in DIMACS:
-4727 -4728 -4729  0

c i = 28
c  -2+1 --> -1
c    ( b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧  p_56) -> ( b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0)
c  in CNF:
c    -b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨  b^{2, 29}_2
c    -b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_1
c    -b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨  b^{2, 29}_0
c  in DIMACS:
-4730 -4731  4732 -56  4733 0
-4730 -4731  4732 -56 -4734 0
-4730 -4731  4732 -56  4735 0

c  -1+1 --> 0
c    ( b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0 ∧  p_56) -> (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧ -b^{2, 29}_0)
c  in CNF:
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_2
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_1
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_0
c  in DIMACS:
-4730  4731 -4732 -56 -4733 0
-4730  4731 -4732 -56 -4734 0
-4730  4731 -4732 -56 -4735 0

c  0+1 --> 1
c    (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧  p_56) -> (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0)
c  in CNF:
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_2
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_1
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨  b^{2, 29}_0
c  in DIMACS:
 4730  4731  4732 -56 -4733 0
 4730  4731  4732 -56 -4734 0
 4730  4731  4732 -56  4735 0

c  1+1 --> 2
c    (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0 ∧  p_56) -> (-b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0)
c  in CNF:
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_2
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨  b^{2, 29}_1
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ -p_56 ∨ -b^{2, 29}_0
c  in DIMACS:
 4730  4731 -4732 -56 -4733 0
 4730  4731 -4732 -56  4734 0
 4730  4731 -4732 -56 -4735 0

c  2+1 --> break 
c    (-b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧  p_56) -> break
c  in CNF:
c     b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 4730 -4731  4732 -56 1162 0


c  2-1 --> 1
c    (-b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧ -p_56) -> (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0)
c  in CNF:
c     b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_2
c     b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_1
c     b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨  b^{2, 29}_0
c  in DIMACS:
 4730 -4731  4732  56 -4733 0
 4730 -4731  4732  56 -4734 0
 4730 -4731  4732  56  4735 0

c  1-1 --> 0
c    (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0 ∧ -p_56) -> (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧ -b^{2, 29}_0)
c  in CNF:
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_2
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_1
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_0
c  in DIMACS:
 4730  4731 -4732  56 -4733 0
 4730  4731 -4732  56 -4734 0
 4730  4731 -4732  56 -4735 0

c  0-1 --> -1
c    (-b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧ -p_56) -> ( b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0)
c  in CNF:
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨  b^{2, 29}_2
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_1
c     b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨  b^{2, 29}_0
c  in DIMACS:
 4730  4731  4732  56  4733 0
 4730  4731  4732  56 -4734 0
 4730  4731  4732  56  4735 0

c  -1-1 --> -2
c    ( b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧  b^{2, 28}_0 ∧ -p_56) -> ( b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0)
c  in CNF:
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨  b^{2, 29}_2
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨  b^{2, 29}_1
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨  p_56 ∨ -b^{2, 29}_0
c  in DIMACS:
-4730  4731 -4732  56  4733 0
-4730  4731 -4732  56  4734 0
-4730  4731 -4732  56 -4735 0

c  -2-1 --> break 
c    ( b^{2, 28}_2 ∧  b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨  b^{2, 28}_0 ∨  p_56 ∨ break
c  in DIMACS:
-4730 -4731  4732  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 28}_2 ∧ -b^{2, 28}_1 ∧ -b^{2, 28}_0 ∧ true) 
c  in CNF:
c    -b^{2, 28}_2 ∨  b^{2, 28}_1 ∨  b^{2, 28}_0 ∨ false 
c  in DIMACS:
-4730  4731  4732  0

c  3 does not represent an automaton state.
c    -(-b^{2, 28}_2 ∧  b^{2, 28}_1 ∧  b^{2, 28}_0 ∧ true) 
c  in CNF:
c     b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ false 
c  in DIMACS:
 4730 -4731 -4732  0
c  -3 does not represent an automaton state.
c    -( b^{2, 28}_2 ∧  b^{2, 28}_1 ∧  b^{2, 28}_0 ∧ true) 
c  in CNF:
c    -b^{2, 28}_2 ∨ -b^{2, 28}_1 ∨ -b^{2, 28}_0 ∨ false 
c  in DIMACS:
-4730 -4731 -4732  0

c i = 29
c  -2+1 --> -1
c    ( b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧  p_58) -> ( b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0)
c  in CNF:
c    -b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨  b^{2, 30}_2
c    -b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_1
c    -b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨  b^{2, 30}_0
c  in DIMACS:
-4733 -4734  4735 -58  4736 0
-4733 -4734  4735 -58 -4737 0
-4733 -4734  4735 -58  4738 0

c  -1+1 --> 0
c    ( b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0 ∧  p_58) -> (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧ -b^{2, 30}_0)
c  in CNF:
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_2
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_1
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_0
c  in DIMACS:
-4733  4734 -4735 -58 -4736 0
-4733  4734 -4735 -58 -4737 0
-4733  4734 -4735 -58 -4738 0

c  0+1 --> 1
c    (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧  p_58) -> (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0)
c  in CNF:
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_2
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_1
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨  b^{2, 30}_0
c  in DIMACS:
 4733  4734  4735 -58 -4736 0
 4733  4734  4735 -58 -4737 0
 4733  4734  4735 -58  4738 0

c  1+1 --> 2
c    (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0 ∧  p_58) -> (-b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0)
c  in CNF:
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_2
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨  b^{2, 30}_1
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ -p_58 ∨ -b^{2, 30}_0
c  in DIMACS:
 4733  4734 -4735 -58 -4736 0
 4733  4734 -4735 -58  4737 0
 4733  4734 -4735 -58 -4738 0

c  2+1 --> break 
c    (-b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧  p_58) -> break
c  in CNF:
c     b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ -p_58 ∨ break
c  in DIMACS:
 4733 -4734  4735 -58 1162 0


c  2-1 --> 1
c    (-b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧ -p_58) -> (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0)
c  in CNF:
c     b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_2
c     b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_1
c     b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨  b^{2, 30}_0
c  in DIMACS:
 4733 -4734  4735  58 -4736 0
 4733 -4734  4735  58 -4737 0
 4733 -4734  4735  58  4738 0

c  1-1 --> 0
c    (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0 ∧ -p_58) -> (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧ -b^{2, 30}_0)
c  in CNF:
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_2
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_1
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_0
c  in DIMACS:
 4733  4734 -4735  58 -4736 0
 4733  4734 -4735  58 -4737 0
 4733  4734 -4735  58 -4738 0

c  0-1 --> -1
c    (-b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧ -p_58) -> ( b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0)
c  in CNF:
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨  b^{2, 30}_2
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_1
c     b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨  b^{2, 30}_0
c  in DIMACS:
 4733  4734  4735  58  4736 0
 4733  4734  4735  58 -4737 0
 4733  4734  4735  58  4738 0

c  -1-1 --> -2
c    ( b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧  b^{2, 29}_0 ∧ -p_58) -> ( b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0)
c  in CNF:
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨  b^{2, 30}_2
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨  b^{2, 30}_1
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨  p_58 ∨ -b^{2, 30}_0
c  in DIMACS:
-4733  4734 -4735  58  4736 0
-4733  4734 -4735  58  4737 0
-4733  4734 -4735  58 -4738 0

c  -2-1 --> break 
c    ( b^{2, 29}_2 ∧  b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧ -p_58) -> break
c  in CNF:
c    -b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨  b^{2, 29}_0 ∨  p_58 ∨ break
c  in DIMACS:
-4733 -4734  4735  58 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 29}_2 ∧ -b^{2, 29}_1 ∧ -b^{2, 29}_0 ∧ true) 
c  in CNF:
c    -b^{2, 29}_2 ∨  b^{2, 29}_1 ∨  b^{2, 29}_0 ∨ false 
c  in DIMACS:
-4733  4734  4735  0

c  3 does not represent an automaton state.
c    -(-b^{2, 29}_2 ∧  b^{2, 29}_1 ∧  b^{2, 29}_0 ∧ true) 
c  in CNF:
c     b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ false 
c  in DIMACS:
 4733 -4734 -4735  0
c  -3 does not represent an automaton state.
c    -( b^{2, 29}_2 ∧  b^{2, 29}_1 ∧  b^{2, 29}_0 ∧ true) 
c  in CNF:
c    -b^{2, 29}_2 ∨ -b^{2, 29}_1 ∨ -b^{2, 29}_0 ∨ false 
c  in DIMACS:
-4733 -4734 -4735  0

c i = 30
c  -2+1 --> -1
c    ( b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧  p_60) -> ( b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0)
c  in CNF:
c    -b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨  b^{2, 31}_2
c    -b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_1
c    -b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨  b^{2, 31}_0
c  in DIMACS:
-4736 -4737  4738 -60  4739 0
-4736 -4737  4738 -60 -4740 0
-4736 -4737  4738 -60  4741 0

c  -1+1 --> 0
c    ( b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0 ∧  p_60) -> (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧ -b^{2, 31}_0)
c  in CNF:
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_2
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_1
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_0
c  in DIMACS:
-4736  4737 -4738 -60 -4739 0
-4736  4737 -4738 -60 -4740 0
-4736  4737 -4738 -60 -4741 0

c  0+1 --> 1
c    (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧  p_60) -> (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0)
c  in CNF:
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_2
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_1
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨  b^{2, 31}_0
c  in DIMACS:
 4736  4737  4738 -60 -4739 0
 4736  4737  4738 -60 -4740 0
 4736  4737  4738 -60  4741 0

c  1+1 --> 2
c    (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0 ∧  p_60) -> (-b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0)
c  in CNF:
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_2
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨  b^{2, 31}_1
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ -p_60 ∨ -b^{2, 31}_0
c  in DIMACS:
 4736  4737 -4738 -60 -4739 0
 4736  4737 -4738 -60  4740 0
 4736  4737 -4738 -60 -4741 0

c  2+1 --> break 
c    (-b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧  p_60) -> break
c  in CNF:
c     b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 4736 -4737  4738 -60 1162 0


c  2-1 --> 1
c    (-b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧ -p_60) -> (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0)
c  in CNF:
c     b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_2
c     b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_1
c     b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨  b^{2, 31}_0
c  in DIMACS:
 4736 -4737  4738  60 -4739 0
 4736 -4737  4738  60 -4740 0
 4736 -4737  4738  60  4741 0

c  1-1 --> 0
c    (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0 ∧ -p_60) -> (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧ -b^{2, 31}_0)
c  in CNF:
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_2
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_1
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_0
c  in DIMACS:
 4736  4737 -4738  60 -4739 0
 4736  4737 -4738  60 -4740 0
 4736  4737 -4738  60 -4741 0

c  0-1 --> -1
c    (-b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧ -p_60) -> ( b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0)
c  in CNF:
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨  b^{2, 31}_2
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_1
c     b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨  b^{2, 31}_0
c  in DIMACS:
 4736  4737  4738  60  4739 0
 4736  4737  4738  60 -4740 0
 4736  4737  4738  60  4741 0

c  -1-1 --> -2
c    ( b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧  b^{2, 30}_0 ∧ -p_60) -> ( b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0)
c  in CNF:
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨  b^{2, 31}_2
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨  b^{2, 31}_1
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨  p_60 ∨ -b^{2, 31}_0
c  in DIMACS:
-4736  4737 -4738  60  4739 0
-4736  4737 -4738  60  4740 0
-4736  4737 -4738  60 -4741 0

c  -2-1 --> break 
c    ( b^{2, 30}_2 ∧  b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨  b^{2, 30}_0 ∨  p_60 ∨ break
c  in DIMACS:
-4736 -4737  4738  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 30}_2 ∧ -b^{2, 30}_1 ∧ -b^{2, 30}_0 ∧ true) 
c  in CNF:
c    -b^{2, 30}_2 ∨  b^{2, 30}_1 ∨  b^{2, 30}_0 ∨ false 
c  in DIMACS:
-4736  4737  4738  0

c  3 does not represent an automaton state.
c    -(-b^{2, 30}_2 ∧  b^{2, 30}_1 ∧  b^{2, 30}_0 ∧ true) 
c  in CNF:
c     b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ false 
c  in DIMACS:
 4736 -4737 -4738  0
c  -3 does not represent an automaton state.
c    -( b^{2, 30}_2 ∧  b^{2, 30}_1 ∧  b^{2, 30}_0 ∧ true) 
c  in CNF:
c    -b^{2, 30}_2 ∨ -b^{2, 30}_1 ∨ -b^{2, 30}_0 ∨ false 
c  in DIMACS:
-4736 -4737 -4738  0

c i = 31
c  -2+1 --> -1
c    ( b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧  p_62) -> ( b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0)
c  in CNF:
c    -b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨  b^{2, 32}_2
c    -b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_1
c    -b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨  b^{2, 32}_0
c  in DIMACS:
-4739 -4740  4741 -62  4742 0
-4739 -4740  4741 -62 -4743 0
-4739 -4740  4741 -62  4744 0

c  -1+1 --> 0
c    ( b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0 ∧  p_62) -> (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧ -b^{2, 32}_0)
c  in CNF:
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_2
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_1
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_0
c  in DIMACS:
-4739  4740 -4741 -62 -4742 0
-4739  4740 -4741 -62 -4743 0
-4739  4740 -4741 -62 -4744 0

c  0+1 --> 1
c    (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧  p_62) -> (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0)
c  in CNF:
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_2
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_1
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨  b^{2, 32}_0
c  in DIMACS:
 4739  4740  4741 -62 -4742 0
 4739  4740  4741 -62 -4743 0
 4739  4740  4741 -62  4744 0

c  1+1 --> 2
c    (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0 ∧  p_62) -> (-b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0)
c  in CNF:
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_2
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨  b^{2, 32}_1
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ -p_62 ∨ -b^{2, 32}_0
c  in DIMACS:
 4739  4740 -4741 -62 -4742 0
 4739  4740 -4741 -62  4743 0
 4739  4740 -4741 -62 -4744 0

c  2+1 --> break 
c    (-b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧  p_62) -> break
c  in CNF:
c     b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ -p_62 ∨ break
c  in DIMACS:
 4739 -4740  4741 -62 1162 0


c  2-1 --> 1
c    (-b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧ -p_62) -> (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0)
c  in CNF:
c     b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_2
c     b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_1
c     b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨  b^{2, 32}_0
c  in DIMACS:
 4739 -4740  4741  62 -4742 0
 4739 -4740  4741  62 -4743 0
 4739 -4740  4741  62  4744 0

c  1-1 --> 0
c    (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0 ∧ -p_62) -> (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧ -b^{2, 32}_0)
c  in CNF:
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_2
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_1
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_0
c  in DIMACS:
 4739  4740 -4741  62 -4742 0
 4739  4740 -4741  62 -4743 0
 4739  4740 -4741  62 -4744 0

c  0-1 --> -1
c    (-b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧ -p_62) -> ( b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0)
c  in CNF:
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨  b^{2, 32}_2
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_1
c     b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨  b^{2, 32}_0
c  in DIMACS:
 4739  4740  4741  62  4742 0
 4739  4740  4741  62 -4743 0
 4739  4740  4741  62  4744 0

c  -1-1 --> -2
c    ( b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧  b^{2, 31}_0 ∧ -p_62) -> ( b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0)
c  in CNF:
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨  b^{2, 32}_2
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨  b^{2, 32}_1
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨  p_62 ∨ -b^{2, 32}_0
c  in DIMACS:
-4739  4740 -4741  62  4742 0
-4739  4740 -4741  62  4743 0
-4739  4740 -4741  62 -4744 0

c  -2-1 --> break 
c    ( b^{2, 31}_2 ∧  b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧ -p_62) -> break
c  in CNF:
c    -b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨  b^{2, 31}_0 ∨  p_62 ∨ break
c  in DIMACS:
-4739 -4740  4741  62 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 31}_2 ∧ -b^{2, 31}_1 ∧ -b^{2, 31}_0 ∧ true) 
c  in CNF:
c    -b^{2, 31}_2 ∨  b^{2, 31}_1 ∨  b^{2, 31}_0 ∨ false 
c  in DIMACS:
-4739  4740  4741  0

c  3 does not represent an automaton state.
c    -(-b^{2, 31}_2 ∧  b^{2, 31}_1 ∧  b^{2, 31}_0 ∧ true) 
c  in CNF:
c     b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ false 
c  in DIMACS:
 4739 -4740 -4741  0
c  -3 does not represent an automaton state.
c    -( b^{2, 31}_2 ∧  b^{2, 31}_1 ∧  b^{2, 31}_0 ∧ true) 
c  in CNF:
c    -b^{2, 31}_2 ∨ -b^{2, 31}_1 ∨ -b^{2, 31}_0 ∨ false 
c  in DIMACS:
-4739 -4740 -4741  0

c i = 32
c  -2+1 --> -1
c    ( b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧  p_64) -> ( b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0)
c  in CNF:
c    -b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨  b^{2, 33}_2
c    -b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_1
c    -b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨  b^{2, 33}_0
c  in DIMACS:
-4742 -4743  4744 -64  4745 0
-4742 -4743  4744 -64 -4746 0
-4742 -4743  4744 -64  4747 0

c  -1+1 --> 0
c    ( b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0 ∧  p_64) -> (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧ -b^{2, 33}_0)
c  in CNF:
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_2
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_1
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_0
c  in DIMACS:
-4742  4743 -4744 -64 -4745 0
-4742  4743 -4744 -64 -4746 0
-4742  4743 -4744 -64 -4747 0

c  0+1 --> 1
c    (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧  p_64) -> (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0)
c  in CNF:
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_2
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_1
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨  b^{2, 33}_0
c  in DIMACS:
 4742  4743  4744 -64 -4745 0
 4742  4743  4744 -64 -4746 0
 4742  4743  4744 -64  4747 0

c  1+1 --> 2
c    (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0 ∧  p_64) -> (-b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0)
c  in CNF:
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_2
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨  b^{2, 33}_1
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ -p_64 ∨ -b^{2, 33}_0
c  in DIMACS:
 4742  4743 -4744 -64 -4745 0
 4742  4743 -4744 -64  4746 0
 4742  4743 -4744 -64 -4747 0

c  2+1 --> break 
c    (-b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧  p_64) -> break
c  in CNF:
c     b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 4742 -4743  4744 -64 1162 0


c  2-1 --> 1
c    (-b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧ -p_64) -> (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0)
c  in CNF:
c     b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_2
c     b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_1
c     b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨  b^{2, 33}_0
c  in DIMACS:
 4742 -4743  4744  64 -4745 0
 4742 -4743  4744  64 -4746 0
 4742 -4743  4744  64  4747 0

c  1-1 --> 0
c    (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0 ∧ -p_64) -> (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧ -b^{2, 33}_0)
c  in CNF:
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_2
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_1
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_0
c  in DIMACS:
 4742  4743 -4744  64 -4745 0
 4742  4743 -4744  64 -4746 0
 4742  4743 -4744  64 -4747 0

c  0-1 --> -1
c    (-b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧ -p_64) -> ( b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0)
c  in CNF:
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨  b^{2, 33}_2
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_1
c     b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨  b^{2, 33}_0
c  in DIMACS:
 4742  4743  4744  64  4745 0
 4742  4743  4744  64 -4746 0
 4742  4743  4744  64  4747 0

c  -1-1 --> -2
c    ( b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧  b^{2, 32}_0 ∧ -p_64) -> ( b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0)
c  in CNF:
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨  b^{2, 33}_2
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨  b^{2, 33}_1
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨  p_64 ∨ -b^{2, 33}_0
c  in DIMACS:
-4742  4743 -4744  64  4745 0
-4742  4743 -4744  64  4746 0
-4742  4743 -4744  64 -4747 0

c  -2-1 --> break 
c    ( b^{2, 32}_2 ∧  b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨  b^{2, 32}_0 ∨  p_64 ∨ break
c  in DIMACS:
-4742 -4743  4744  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 32}_2 ∧ -b^{2, 32}_1 ∧ -b^{2, 32}_0 ∧ true) 
c  in CNF:
c    -b^{2, 32}_2 ∨  b^{2, 32}_1 ∨  b^{2, 32}_0 ∨ false 
c  in DIMACS:
-4742  4743  4744  0

c  3 does not represent an automaton state.
c    -(-b^{2, 32}_2 ∧  b^{2, 32}_1 ∧  b^{2, 32}_0 ∧ true) 
c  in CNF:
c     b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ false 
c  in DIMACS:
 4742 -4743 -4744  0
c  -3 does not represent an automaton state.
c    -( b^{2, 32}_2 ∧  b^{2, 32}_1 ∧  b^{2, 32}_0 ∧ true) 
c  in CNF:
c    -b^{2, 32}_2 ∨ -b^{2, 32}_1 ∨ -b^{2, 32}_0 ∨ false 
c  in DIMACS:
-4742 -4743 -4744  0

c i = 33
c  -2+1 --> -1
c    ( b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧  p_66) -> ( b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0)
c  in CNF:
c    -b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨  b^{2, 34}_2
c    -b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_1
c    -b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨  b^{2, 34}_0
c  in DIMACS:
-4745 -4746  4747 -66  4748 0
-4745 -4746  4747 -66 -4749 0
-4745 -4746  4747 -66  4750 0

c  -1+1 --> 0
c    ( b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0 ∧  p_66) -> (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧ -b^{2, 34}_0)
c  in CNF:
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_2
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_1
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_0
c  in DIMACS:
-4745  4746 -4747 -66 -4748 0
-4745  4746 -4747 -66 -4749 0
-4745  4746 -4747 -66 -4750 0

c  0+1 --> 1
c    (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧  p_66) -> (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0)
c  in CNF:
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_2
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_1
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨  b^{2, 34}_0
c  in DIMACS:
 4745  4746  4747 -66 -4748 0
 4745  4746  4747 -66 -4749 0
 4745  4746  4747 -66  4750 0

c  1+1 --> 2
c    (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0 ∧  p_66) -> (-b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0)
c  in CNF:
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_2
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨  b^{2, 34}_1
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ -p_66 ∨ -b^{2, 34}_0
c  in DIMACS:
 4745  4746 -4747 -66 -4748 0
 4745  4746 -4747 -66  4749 0
 4745  4746 -4747 -66 -4750 0

c  2+1 --> break 
c    (-b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧  p_66) -> break
c  in CNF:
c     b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 4745 -4746  4747 -66 1162 0


c  2-1 --> 1
c    (-b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧ -p_66) -> (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0)
c  in CNF:
c     b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_2
c     b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_1
c     b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨  b^{2, 34}_0
c  in DIMACS:
 4745 -4746  4747  66 -4748 0
 4745 -4746  4747  66 -4749 0
 4745 -4746  4747  66  4750 0

c  1-1 --> 0
c    (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0 ∧ -p_66) -> (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧ -b^{2, 34}_0)
c  in CNF:
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_2
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_1
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_0
c  in DIMACS:
 4745  4746 -4747  66 -4748 0
 4745  4746 -4747  66 -4749 0
 4745  4746 -4747  66 -4750 0

c  0-1 --> -1
c    (-b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧ -p_66) -> ( b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0)
c  in CNF:
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨  b^{2, 34}_2
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_1
c     b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨  b^{2, 34}_0
c  in DIMACS:
 4745  4746  4747  66  4748 0
 4745  4746  4747  66 -4749 0
 4745  4746  4747  66  4750 0

c  -1-1 --> -2
c    ( b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧  b^{2, 33}_0 ∧ -p_66) -> ( b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0)
c  in CNF:
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨  b^{2, 34}_2
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨  b^{2, 34}_1
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨  p_66 ∨ -b^{2, 34}_0
c  in DIMACS:
-4745  4746 -4747  66  4748 0
-4745  4746 -4747  66  4749 0
-4745  4746 -4747  66 -4750 0

c  -2-1 --> break 
c    ( b^{2, 33}_2 ∧  b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨  b^{2, 33}_0 ∨  p_66 ∨ break
c  in DIMACS:
-4745 -4746  4747  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 33}_2 ∧ -b^{2, 33}_1 ∧ -b^{2, 33}_0 ∧ true) 
c  in CNF:
c    -b^{2, 33}_2 ∨  b^{2, 33}_1 ∨  b^{2, 33}_0 ∨ false 
c  in DIMACS:
-4745  4746  4747  0

c  3 does not represent an automaton state.
c    -(-b^{2, 33}_2 ∧  b^{2, 33}_1 ∧  b^{2, 33}_0 ∧ true) 
c  in CNF:
c     b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ false 
c  in DIMACS:
 4745 -4746 -4747  0
c  -3 does not represent an automaton state.
c    -( b^{2, 33}_2 ∧  b^{2, 33}_1 ∧  b^{2, 33}_0 ∧ true) 
c  in CNF:
c    -b^{2, 33}_2 ∨ -b^{2, 33}_1 ∨ -b^{2, 33}_0 ∨ false 
c  in DIMACS:
-4745 -4746 -4747  0

c i = 34
c  -2+1 --> -1
c    ( b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧  p_68) -> ( b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0)
c  in CNF:
c    -b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨  b^{2, 35}_2
c    -b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_1
c    -b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨  b^{2, 35}_0
c  in DIMACS:
-4748 -4749  4750 -68  4751 0
-4748 -4749  4750 -68 -4752 0
-4748 -4749  4750 -68  4753 0

c  -1+1 --> 0
c    ( b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0 ∧  p_68) -> (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧ -b^{2, 35}_0)
c  in CNF:
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_2
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_1
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_0
c  in DIMACS:
-4748  4749 -4750 -68 -4751 0
-4748  4749 -4750 -68 -4752 0
-4748  4749 -4750 -68 -4753 0

c  0+1 --> 1
c    (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧  p_68) -> (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0)
c  in CNF:
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_2
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_1
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨  b^{2, 35}_0
c  in DIMACS:
 4748  4749  4750 -68 -4751 0
 4748  4749  4750 -68 -4752 0
 4748  4749  4750 -68  4753 0

c  1+1 --> 2
c    (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0 ∧  p_68) -> (-b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0)
c  in CNF:
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_2
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨  b^{2, 35}_1
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ -p_68 ∨ -b^{2, 35}_0
c  in DIMACS:
 4748  4749 -4750 -68 -4751 0
 4748  4749 -4750 -68  4752 0
 4748  4749 -4750 -68 -4753 0

c  2+1 --> break 
c    (-b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧  p_68) -> break
c  in CNF:
c     b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 4748 -4749  4750 -68 1162 0


c  2-1 --> 1
c    (-b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧ -p_68) -> (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0)
c  in CNF:
c     b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_2
c     b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_1
c     b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨  b^{2, 35}_0
c  in DIMACS:
 4748 -4749  4750  68 -4751 0
 4748 -4749  4750  68 -4752 0
 4748 -4749  4750  68  4753 0

c  1-1 --> 0
c    (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0 ∧ -p_68) -> (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧ -b^{2, 35}_0)
c  in CNF:
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_2
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_1
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_0
c  in DIMACS:
 4748  4749 -4750  68 -4751 0
 4748  4749 -4750  68 -4752 0
 4748  4749 -4750  68 -4753 0

c  0-1 --> -1
c    (-b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧ -p_68) -> ( b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0)
c  in CNF:
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨  b^{2, 35}_2
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_1
c     b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨  b^{2, 35}_0
c  in DIMACS:
 4748  4749  4750  68  4751 0
 4748  4749  4750  68 -4752 0
 4748  4749  4750  68  4753 0

c  -1-1 --> -2
c    ( b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧  b^{2, 34}_0 ∧ -p_68) -> ( b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0)
c  in CNF:
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨  b^{2, 35}_2
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨  b^{2, 35}_1
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨  p_68 ∨ -b^{2, 35}_0
c  in DIMACS:
-4748  4749 -4750  68  4751 0
-4748  4749 -4750  68  4752 0
-4748  4749 -4750  68 -4753 0

c  -2-1 --> break 
c    ( b^{2, 34}_2 ∧  b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨  b^{2, 34}_0 ∨  p_68 ∨ break
c  in DIMACS:
-4748 -4749  4750  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 34}_2 ∧ -b^{2, 34}_1 ∧ -b^{2, 34}_0 ∧ true) 
c  in CNF:
c    -b^{2, 34}_2 ∨  b^{2, 34}_1 ∨  b^{2, 34}_0 ∨ false 
c  in DIMACS:
-4748  4749  4750  0

c  3 does not represent an automaton state.
c    -(-b^{2, 34}_2 ∧  b^{2, 34}_1 ∧  b^{2, 34}_0 ∧ true) 
c  in CNF:
c     b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ false 
c  in DIMACS:
 4748 -4749 -4750  0
c  -3 does not represent an automaton state.
c    -( b^{2, 34}_2 ∧  b^{2, 34}_1 ∧  b^{2, 34}_0 ∧ true) 
c  in CNF:
c    -b^{2, 34}_2 ∨ -b^{2, 34}_1 ∨ -b^{2, 34}_0 ∨ false 
c  in DIMACS:
-4748 -4749 -4750  0

c i = 35
c  -2+1 --> -1
c    ( b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧  p_70) -> ( b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0)
c  in CNF:
c    -b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨  b^{2, 36}_2
c    -b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_1
c    -b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨  b^{2, 36}_0
c  in DIMACS:
-4751 -4752  4753 -70  4754 0
-4751 -4752  4753 -70 -4755 0
-4751 -4752  4753 -70  4756 0

c  -1+1 --> 0
c    ( b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0 ∧  p_70) -> (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧ -b^{2, 36}_0)
c  in CNF:
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_2
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_1
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_0
c  in DIMACS:
-4751  4752 -4753 -70 -4754 0
-4751  4752 -4753 -70 -4755 0
-4751  4752 -4753 -70 -4756 0

c  0+1 --> 1
c    (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧  p_70) -> (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0)
c  in CNF:
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_2
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_1
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨  b^{2, 36}_0
c  in DIMACS:
 4751  4752  4753 -70 -4754 0
 4751  4752  4753 -70 -4755 0
 4751  4752  4753 -70  4756 0

c  1+1 --> 2
c    (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0 ∧  p_70) -> (-b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0)
c  in CNF:
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_2
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨  b^{2, 36}_1
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ -p_70 ∨ -b^{2, 36}_0
c  in DIMACS:
 4751  4752 -4753 -70 -4754 0
 4751  4752 -4753 -70  4755 0
 4751  4752 -4753 -70 -4756 0

c  2+1 --> break 
c    (-b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧  p_70) -> break
c  in CNF:
c     b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 4751 -4752  4753 -70 1162 0


c  2-1 --> 1
c    (-b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧ -p_70) -> (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0)
c  in CNF:
c     b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_2
c     b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_1
c     b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨  b^{2, 36}_0
c  in DIMACS:
 4751 -4752  4753  70 -4754 0
 4751 -4752  4753  70 -4755 0
 4751 -4752  4753  70  4756 0

c  1-1 --> 0
c    (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0 ∧ -p_70) -> (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧ -b^{2, 36}_0)
c  in CNF:
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_2
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_1
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_0
c  in DIMACS:
 4751  4752 -4753  70 -4754 0
 4751  4752 -4753  70 -4755 0
 4751  4752 -4753  70 -4756 0

c  0-1 --> -1
c    (-b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧ -p_70) -> ( b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0)
c  in CNF:
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨  b^{2, 36}_2
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_1
c     b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨  b^{2, 36}_0
c  in DIMACS:
 4751  4752  4753  70  4754 0
 4751  4752  4753  70 -4755 0
 4751  4752  4753  70  4756 0

c  -1-1 --> -2
c    ( b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧  b^{2, 35}_0 ∧ -p_70) -> ( b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0)
c  in CNF:
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨  b^{2, 36}_2
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨  b^{2, 36}_1
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨  p_70 ∨ -b^{2, 36}_0
c  in DIMACS:
-4751  4752 -4753  70  4754 0
-4751  4752 -4753  70  4755 0
-4751  4752 -4753  70 -4756 0

c  -2-1 --> break 
c    ( b^{2, 35}_2 ∧  b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨  b^{2, 35}_0 ∨  p_70 ∨ break
c  in DIMACS:
-4751 -4752  4753  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 35}_2 ∧ -b^{2, 35}_1 ∧ -b^{2, 35}_0 ∧ true) 
c  in CNF:
c    -b^{2, 35}_2 ∨  b^{2, 35}_1 ∨  b^{2, 35}_0 ∨ false 
c  in DIMACS:
-4751  4752  4753  0

c  3 does not represent an automaton state.
c    -(-b^{2, 35}_2 ∧  b^{2, 35}_1 ∧  b^{2, 35}_0 ∧ true) 
c  in CNF:
c     b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ false 
c  in DIMACS:
 4751 -4752 -4753  0
c  -3 does not represent an automaton state.
c    -( b^{2, 35}_2 ∧  b^{2, 35}_1 ∧  b^{2, 35}_0 ∧ true) 
c  in CNF:
c    -b^{2, 35}_2 ∨ -b^{2, 35}_1 ∨ -b^{2, 35}_0 ∨ false 
c  in DIMACS:
-4751 -4752 -4753  0

c i = 36
c  -2+1 --> -1
c    ( b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧  p_72) -> ( b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0)
c  in CNF:
c    -b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨  b^{2, 37}_2
c    -b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_1
c    -b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨  b^{2, 37}_0
c  in DIMACS:
-4754 -4755  4756 -72  4757 0
-4754 -4755  4756 -72 -4758 0
-4754 -4755  4756 -72  4759 0

c  -1+1 --> 0
c    ( b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0 ∧  p_72) -> (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧ -b^{2, 37}_0)
c  in CNF:
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_2
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_1
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_0
c  in DIMACS:
-4754  4755 -4756 -72 -4757 0
-4754  4755 -4756 -72 -4758 0
-4754  4755 -4756 -72 -4759 0

c  0+1 --> 1
c    (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧  p_72) -> (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0)
c  in CNF:
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_2
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_1
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨  b^{2, 37}_0
c  in DIMACS:
 4754  4755  4756 -72 -4757 0
 4754  4755  4756 -72 -4758 0
 4754  4755  4756 -72  4759 0

c  1+1 --> 2
c    (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0 ∧  p_72) -> (-b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0)
c  in CNF:
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_2
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨  b^{2, 37}_1
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ -p_72 ∨ -b^{2, 37}_0
c  in DIMACS:
 4754  4755 -4756 -72 -4757 0
 4754  4755 -4756 -72  4758 0
 4754  4755 -4756 -72 -4759 0

c  2+1 --> break 
c    (-b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧  p_72) -> break
c  in CNF:
c     b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 4754 -4755  4756 -72 1162 0


c  2-1 --> 1
c    (-b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧ -p_72) -> (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0)
c  in CNF:
c     b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_2
c     b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_1
c     b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨  b^{2, 37}_0
c  in DIMACS:
 4754 -4755  4756  72 -4757 0
 4754 -4755  4756  72 -4758 0
 4754 -4755  4756  72  4759 0

c  1-1 --> 0
c    (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0 ∧ -p_72) -> (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧ -b^{2, 37}_0)
c  in CNF:
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_2
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_1
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_0
c  in DIMACS:
 4754  4755 -4756  72 -4757 0
 4754  4755 -4756  72 -4758 0
 4754  4755 -4756  72 -4759 0

c  0-1 --> -1
c    (-b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧ -p_72) -> ( b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0)
c  in CNF:
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨  b^{2, 37}_2
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_1
c     b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨  b^{2, 37}_0
c  in DIMACS:
 4754  4755  4756  72  4757 0
 4754  4755  4756  72 -4758 0
 4754  4755  4756  72  4759 0

c  -1-1 --> -2
c    ( b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧  b^{2, 36}_0 ∧ -p_72) -> ( b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0)
c  in CNF:
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨  b^{2, 37}_2
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨  b^{2, 37}_1
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨  p_72 ∨ -b^{2, 37}_0
c  in DIMACS:
-4754  4755 -4756  72  4757 0
-4754  4755 -4756  72  4758 0
-4754  4755 -4756  72 -4759 0

c  -2-1 --> break 
c    ( b^{2, 36}_2 ∧  b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨  b^{2, 36}_0 ∨  p_72 ∨ break
c  in DIMACS:
-4754 -4755  4756  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 36}_2 ∧ -b^{2, 36}_1 ∧ -b^{2, 36}_0 ∧ true) 
c  in CNF:
c    -b^{2, 36}_2 ∨  b^{2, 36}_1 ∨  b^{2, 36}_0 ∨ false 
c  in DIMACS:
-4754  4755  4756  0

c  3 does not represent an automaton state.
c    -(-b^{2, 36}_2 ∧  b^{2, 36}_1 ∧  b^{2, 36}_0 ∧ true) 
c  in CNF:
c     b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ false 
c  in DIMACS:
 4754 -4755 -4756  0
c  -3 does not represent an automaton state.
c    -( b^{2, 36}_2 ∧  b^{2, 36}_1 ∧  b^{2, 36}_0 ∧ true) 
c  in CNF:
c    -b^{2, 36}_2 ∨ -b^{2, 36}_1 ∨ -b^{2, 36}_0 ∨ false 
c  in DIMACS:
-4754 -4755 -4756  0

c i = 37
c  -2+1 --> -1
c    ( b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧  p_74) -> ( b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0)
c  in CNF:
c    -b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨  b^{2, 38}_2
c    -b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_1
c    -b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨  b^{2, 38}_0
c  in DIMACS:
-4757 -4758  4759 -74  4760 0
-4757 -4758  4759 -74 -4761 0
-4757 -4758  4759 -74  4762 0

c  -1+1 --> 0
c    ( b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0 ∧  p_74) -> (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧ -b^{2, 38}_0)
c  in CNF:
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_2
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_1
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_0
c  in DIMACS:
-4757  4758 -4759 -74 -4760 0
-4757  4758 -4759 -74 -4761 0
-4757  4758 -4759 -74 -4762 0

c  0+1 --> 1
c    (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧  p_74) -> (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0)
c  in CNF:
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_2
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_1
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨  b^{2, 38}_0
c  in DIMACS:
 4757  4758  4759 -74 -4760 0
 4757  4758  4759 -74 -4761 0
 4757  4758  4759 -74  4762 0

c  1+1 --> 2
c    (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0 ∧  p_74) -> (-b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0)
c  in CNF:
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_2
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨  b^{2, 38}_1
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ -p_74 ∨ -b^{2, 38}_0
c  in DIMACS:
 4757  4758 -4759 -74 -4760 0
 4757  4758 -4759 -74  4761 0
 4757  4758 -4759 -74 -4762 0

c  2+1 --> break 
c    (-b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧  p_74) -> break
c  in CNF:
c     b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ -p_74 ∨ break
c  in DIMACS:
 4757 -4758  4759 -74 1162 0


c  2-1 --> 1
c    (-b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧ -p_74) -> (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0)
c  in CNF:
c     b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_2
c     b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_1
c     b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨  b^{2, 38}_0
c  in DIMACS:
 4757 -4758  4759  74 -4760 0
 4757 -4758  4759  74 -4761 0
 4757 -4758  4759  74  4762 0

c  1-1 --> 0
c    (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0 ∧ -p_74) -> (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧ -b^{2, 38}_0)
c  in CNF:
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_2
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_1
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_0
c  in DIMACS:
 4757  4758 -4759  74 -4760 0
 4757  4758 -4759  74 -4761 0
 4757  4758 -4759  74 -4762 0

c  0-1 --> -1
c    (-b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧ -p_74) -> ( b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0)
c  in CNF:
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨  b^{2, 38}_2
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_1
c     b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨  b^{2, 38}_0
c  in DIMACS:
 4757  4758  4759  74  4760 0
 4757  4758  4759  74 -4761 0
 4757  4758  4759  74  4762 0

c  -1-1 --> -2
c    ( b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧  b^{2, 37}_0 ∧ -p_74) -> ( b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0)
c  in CNF:
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨  b^{2, 38}_2
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨  b^{2, 38}_1
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨  p_74 ∨ -b^{2, 38}_0
c  in DIMACS:
-4757  4758 -4759  74  4760 0
-4757  4758 -4759  74  4761 0
-4757  4758 -4759  74 -4762 0

c  -2-1 --> break 
c    ( b^{2, 37}_2 ∧  b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧ -p_74) -> break
c  in CNF:
c    -b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨  b^{2, 37}_0 ∨  p_74 ∨ break
c  in DIMACS:
-4757 -4758  4759  74 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 37}_2 ∧ -b^{2, 37}_1 ∧ -b^{2, 37}_0 ∧ true) 
c  in CNF:
c    -b^{2, 37}_2 ∨  b^{2, 37}_1 ∨  b^{2, 37}_0 ∨ false 
c  in DIMACS:
-4757  4758  4759  0

c  3 does not represent an automaton state.
c    -(-b^{2, 37}_2 ∧  b^{2, 37}_1 ∧  b^{2, 37}_0 ∧ true) 
c  in CNF:
c     b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ false 
c  in DIMACS:
 4757 -4758 -4759  0
c  -3 does not represent an automaton state.
c    -( b^{2, 37}_2 ∧  b^{2, 37}_1 ∧  b^{2, 37}_0 ∧ true) 
c  in CNF:
c    -b^{2, 37}_2 ∨ -b^{2, 37}_1 ∨ -b^{2, 37}_0 ∨ false 
c  in DIMACS:
-4757 -4758 -4759  0

c i = 38
c  -2+1 --> -1
c    ( b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧  p_76) -> ( b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0)
c  in CNF:
c    -b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨  b^{2, 39}_2
c    -b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_1
c    -b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨  b^{2, 39}_0
c  in DIMACS:
-4760 -4761  4762 -76  4763 0
-4760 -4761  4762 -76 -4764 0
-4760 -4761  4762 -76  4765 0

c  -1+1 --> 0
c    ( b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0 ∧  p_76) -> (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧ -b^{2, 39}_0)
c  in CNF:
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_2
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_1
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_0
c  in DIMACS:
-4760  4761 -4762 -76 -4763 0
-4760  4761 -4762 -76 -4764 0
-4760  4761 -4762 -76 -4765 0

c  0+1 --> 1
c    (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧  p_76) -> (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0)
c  in CNF:
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_2
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_1
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨  b^{2, 39}_0
c  in DIMACS:
 4760  4761  4762 -76 -4763 0
 4760  4761  4762 -76 -4764 0
 4760  4761  4762 -76  4765 0

c  1+1 --> 2
c    (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0 ∧  p_76) -> (-b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0)
c  in CNF:
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_2
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨  b^{2, 39}_1
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ -p_76 ∨ -b^{2, 39}_0
c  in DIMACS:
 4760  4761 -4762 -76 -4763 0
 4760  4761 -4762 -76  4764 0
 4760  4761 -4762 -76 -4765 0

c  2+1 --> break 
c    (-b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧  p_76) -> break
c  in CNF:
c     b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 4760 -4761  4762 -76 1162 0


c  2-1 --> 1
c    (-b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧ -p_76) -> (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0)
c  in CNF:
c     b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_2
c     b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_1
c     b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨  b^{2, 39}_0
c  in DIMACS:
 4760 -4761  4762  76 -4763 0
 4760 -4761  4762  76 -4764 0
 4760 -4761  4762  76  4765 0

c  1-1 --> 0
c    (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0 ∧ -p_76) -> (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧ -b^{2, 39}_0)
c  in CNF:
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_2
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_1
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_0
c  in DIMACS:
 4760  4761 -4762  76 -4763 0
 4760  4761 -4762  76 -4764 0
 4760  4761 -4762  76 -4765 0

c  0-1 --> -1
c    (-b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧ -p_76) -> ( b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0)
c  in CNF:
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨  b^{2, 39}_2
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_1
c     b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨  b^{2, 39}_0
c  in DIMACS:
 4760  4761  4762  76  4763 0
 4760  4761  4762  76 -4764 0
 4760  4761  4762  76  4765 0

c  -1-1 --> -2
c    ( b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧  b^{2, 38}_0 ∧ -p_76) -> ( b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0)
c  in CNF:
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨  b^{2, 39}_2
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨  b^{2, 39}_1
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨  p_76 ∨ -b^{2, 39}_0
c  in DIMACS:
-4760  4761 -4762  76  4763 0
-4760  4761 -4762  76  4764 0
-4760  4761 -4762  76 -4765 0

c  -2-1 --> break 
c    ( b^{2, 38}_2 ∧  b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨  b^{2, 38}_0 ∨  p_76 ∨ break
c  in DIMACS:
-4760 -4761  4762  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 38}_2 ∧ -b^{2, 38}_1 ∧ -b^{2, 38}_0 ∧ true) 
c  in CNF:
c    -b^{2, 38}_2 ∨  b^{2, 38}_1 ∨  b^{2, 38}_0 ∨ false 
c  in DIMACS:
-4760  4761  4762  0

c  3 does not represent an automaton state.
c    -(-b^{2, 38}_2 ∧  b^{2, 38}_1 ∧  b^{2, 38}_0 ∧ true) 
c  in CNF:
c     b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ false 
c  in DIMACS:
 4760 -4761 -4762  0
c  -3 does not represent an automaton state.
c    -( b^{2, 38}_2 ∧  b^{2, 38}_1 ∧  b^{2, 38}_0 ∧ true) 
c  in CNF:
c    -b^{2, 38}_2 ∨ -b^{2, 38}_1 ∨ -b^{2, 38}_0 ∨ false 
c  in DIMACS:
-4760 -4761 -4762  0

c i = 39
c  -2+1 --> -1
c    ( b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧  p_78) -> ( b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0)
c  in CNF:
c    -b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨  b^{2, 40}_2
c    -b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_1
c    -b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨  b^{2, 40}_0
c  in DIMACS:
-4763 -4764  4765 -78  4766 0
-4763 -4764  4765 -78 -4767 0
-4763 -4764  4765 -78  4768 0

c  -1+1 --> 0
c    ( b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0 ∧  p_78) -> (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧ -b^{2, 40}_0)
c  in CNF:
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_2
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_1
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_0
c  in DIMACS:
-4763  4764 -4765 -78 -4766 0
-4763  4764 -4765 -78 -4767 0
-4763  4764 -4765 -78 -4768 0

c  0+1 --> 1
c    (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧  p_78) -> (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0)
c  in CNF:
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_2
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_1
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨  b^{2, 40}_0
c  in DIMACS:
 4763  4764  4765 -78 -4766 0
 4763  4764  4765 -78 -4767 0
 4763  4764  4765 -78  4768 0

c  1+1 --> 2
c    (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0 ∧  p_78) -> (-b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0)
c  in CNF:
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_2
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨  b^{2, 40}_1
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ -p_78 ∨ -b^{2, 40}_0
c  in DIMACS:
 4763  4764 -4765 -78 -4766 0
 4763  4764 -4765 -78  4767 0
 4763  4764 -4765 -78 -4768 0

c  2+1 --> break 
c    (-b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧  p_78) -> break
c  in CNF:
c     b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 4763 -4764  4765 -78 1162 0


c  2-1 --> 1
c    (-b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧ -p_78) -> (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0)
c  in CNF:
c     b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_2
c     b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_1
c     b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨  b^{2, 40}_0
c  in DIMACS:
 4763 -4764  4765  78 -4766 0
 4763 -4764  4765  78 -4767 0
 4763 -4764  4765  78  4768 0

c  1-1 --> 0
c    (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0 ∧ -p_78) -> (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧ -b^{2, 40}_0)
c  in CNF:
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_2
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_1
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_0
c  in DIMACS:
 4763  4764 -4765  78 -4766 0
 4763  4764 -4765  78 -4767 0
 4763  4764 -4765  78 -4768 0

c  0-1 --> -1
c    (-b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧ -p_78) -> ( b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0)
c  in CNF:
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨  b^{2, 40}_2
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_1
c     b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨  b^{2, 40}_0
c  in DIMACS:
 4763  4764  4765  78  4766 0
 4763  4764  4765  78 -4767 0
 4763  4764  4765  78  4768 0

c  -1-1 --> -2
c    ( b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧  b^{2, 39}_0 ∧ -p_78) -> ( b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0)
c  in CNF:
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨  b^{2, 40}_2
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨  b^{2, 40}_1
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨  p_78 ∨ -b^{2, 40}_0
c  in DIMACS:
-4763  4764 -4765  78  4766 0
-4763  4764 -4765  78  4767 0
-4763  4764 -4765  78 -4768 0

c  -2-1 --> break 
c    ( b^{2, 39}_2 ∧  b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨  b^{2, 39}_0 ∨  p_78 ∨ break
c  in DIMACS:
-4763 -4764  4765  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 39}_2 ∧ -b^{2, 39}_1 ∧ -b^{2, 39}_0 ∧ true) 
c  in CNF:
c    -b^{2, 39}_2 ∨  b^{2, 39}_1 ∨  b^{2, 39}_0 ∨ false 
c  in DIMACS:
-4763  4764  4765  0

c  3 does not represent an automaton state.
c    -(-b^{2, 39}_2 ∧  b^{2, 39}_1 ∧  b^{2, 39}_0 ∧ true) 
c  in CNF:
c     b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ false 
c  in DIMACS:
 4763 -4764 -4765  0
c  -3 does not represent an automaton state.
c    -( b^{2, 39}_2 ∧  b^{2, 39}_1 ∧  b^{2, 39}_0 ∧ true) 
c  in CNF:
c    -b^{2, 39}_2 ∨ -b^{2, 39}_1 ∨ -b^{2, 39}_0 ∨ false 
c  in DIMACS:
-4763 -4764 -4765  0

c i = 40
c  -2+1 --> -1
c    ( b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧  p_80) -> ( b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0)
c  in CNF:
c    -b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨  b^{2, 41}_2
c    -b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_1
c    -b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨  b^{2, 41}_0
c  in DIMACS:
-4766 -4767  4768 -80  4769 0
-4766 -4767  4768 -80 -4770 0
-4766 -4767  4768 -80  4771 0

c  -1+1 --> 0
c    ( b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0 ∧  p_80) -> (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧ -b^{2, 41}_0)
c  in CNF:
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_2
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_1
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_0
c  in DIMACS:
-4766  4767 -4768 -80 -4769 0
-4766  4767 -4768 -80 -4770 0
-4766  4767 -4768 -80 -4771 0

c  0+1 --> 1
c    (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧  p_80) -> (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0)
c  in CNF:
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_2
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_1
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨  b^{2, 41}_0
c  in DIMACS:
 4766  4767  4768 -80 -4769 0
 4766  4767  4768 -80 -4770 0
 4766  4767  4768 -80  4771 0

c  1+1 --> 2
c    (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0 ∧  p_80) -> (-b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0)
c  in CNF:
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_2
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨  b^{2, 41}_1
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ -p_80 ∨ -b^{2, 41}_0
c  in DIMACS:
 4766  4767 -4768 -80 -4769 0
 4766  4767 -4768 -80  4770 0
 4766  4767 -4768 -80 -4771 0

c  2+1 --> break 
c    (-b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧  p_80) -> break
c  in CNF:
c     b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 4766 -4767  4768 -80 1162 0


c  2-1 --> 1
c    (-b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧ -p_80) -> (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0)
c  in CNF:
c     b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_2
c     b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_1
c     b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨  b^{2, 41}_0
c  in DIMACS:
 4766 -4767  4768  80 -4769 0
 4766 -4767  4768  80 -4770 0
 4766 -4767  4768  80  4771 0

c  1-1 --> 0
c    (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0 ∧ -p_80) -> (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧ -b^{2, 41}_0)
c  in CNF:
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_2
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_1
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_0
c  in DIMACS:
 4766  4767 -4768  80 -4769 0
 4766  4767 -4768  80 -4770 0
 4766  4767 -4768  80 -4771 0

c  0-1 --> -1
c    (-b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧ -p_80) -> ( b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0)
c  in CNF:
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨  b^{2, 41}_2
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_1
c     b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨  b^{2, 41}_0
c  in DIMACS:
 4766  4767  4768  80  4769 0
 4766  4767  4768  80 -4770 0
 4766  4767  4768  80  4771 0

c  -1-1 --> -2
c    ( b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧  b^{2, 40}_0 ∧ -p_80) -> ( b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0)
c  in CNF:
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨  b^{2, 41}_2
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨  b^{2, 41}_1
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨  p_80 ∨ -b^{2, 41}_0
c  in DIMACS:
-4766  4767 -4768  80  4769 0
-4766  4767 -4768  80  4770 0
-4766  4767 -4768  80 -4771 0

c  -2-1 --> break 
c    ( b^{2, 40}_2 ∧  b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨  b^{2, 40}_0 ∨  p_80 ∨ break
c  in DIMACS:
-4766 -4767  4768  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 40}_2 ∧ -b^{2, 40}_1 ∧ -b^{2, 40}_0 ∧ true) 
c  in CNF:
c    -b^{2, 40}_2 ∨  b^{2, 40}_1 ∨  b^{2, 40}_0 ∨ false 
c  in DIMACS:
-4766  4767  4768  0

c  3 does not represent an automaton state.
c    -(-b^{2, 40}_2 ∧  b^{2, 40}_1 ∧  b^{2, 40}_0 ∧ true) 
c  in CNF:
c     b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ false 
c  in DIMACS:
 4766 -4767 -4768  0
c  -3 does not represent an automaton state.
c    -( b^{2, 40}_2 ∧  b^{2, 40}_1 ∧  b^{2, 40}_0 ∧ true) 
c  in CNF:
c    -b^{2, 40}_2 ∨ -b^{2, 40}_1 ∨ -b^{2, 40}_0 ∨ false 
c  in DIMACS:
-4766 -4767 -4768  0

c i = 41
c  -2+1 --> -1
c    ( b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧  p_82) -> ( b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0)
c  in CNF:
c    -b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨  b^{2, 42}_2
c    -b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_1
c    -b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨  b^{2, 42}_0
c  in DIMACS:
-4769 -4770  4771 -82  4772 0
-4769 -4770  4771 -82 -4773 0
-4769 -4770  4771 -82  4774 0

c  -1+1 --> 0
c    ( b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0 ∧  p_82) -> (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧ -b^{2, 42}_0)
c  in CNF:
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_2
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_1
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_0
c  in DIMACS:
-4769  4770 -4771 -82 -4772 0
-4769  4770 -4771 -82 -4773 0
-4769  4770 -4771 -82 -4774 0

c  0+1 --> 1
c    (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧  p_82) -> (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0)
c  in CNF:
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_2
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_1
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨  b^{2, 42}_0
c  in DIMACS:
 4769  4770  4771 -82 -4772 0
 4769  4770  4771 -82 -4773 0
 4769  4770  4771 -82  4774 0

c  1+1 --> 2
c    (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0 ∧  p_82) -> (-b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0)
c  in CNF:
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_2
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨  b^{2, 42}_1
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ -p_82 ∨ -b^{2, 42}_0
c  in DIMACS:
 4769  4770 -4771 -82 -4772 0
 4769  4770 -4771 -82  4773 0
 4769  4770 -4771 -82 -4774 0

c  2+1 --> break 
c    (-b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧  p_82) -> break
c  in CNF:
c     b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ -p_82 ∨ break
c  in DIMACS:
 4769 -4770  4771 -82 1162 0


c  2-1 --> 1
c    (-b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧ -p_82) -> (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0)
c  in CNF:
c     b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_2
c     b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_1
c     b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨  b^{2, 42}_0
c  in DIMACS:
 4769 -4770  4771  82 -4772 0
 4769 -4770  4771  82 -4773 0
 4769 -4770  4771  82  4774 0

c  1-1 --> 0
c    (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0 ∧ -p_82) -> (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧ -b^{2, 42}_0)
c  in CNF:
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_2
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_1
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_0
c  in DIMACS:
 4769  4770 -4771  82 -4772 0
 4769  4770 -4771  82 -4773 0
 4769  4770 -4771  82 -4774 0

c  0-1 --> -1
c    (-b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧ -p_82) -> ( b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0)
c  in CNF:
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨  b^{2, 42}_2
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_1
c     b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨  b^{2, 42}_0
c  in DIMACS:
 4769  4770  4771  82  4772 0
 4769  4770  4771  82 -4773 0
 4769  4770  4771  82  4774 0

c  -1-1 --> -2
c    ( b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧  b^{2, 41}_0 ∧ -p_82) -> ( b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0)
c  in CNF:
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨  b^{2, 42}_2
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨  b^{2, 42}_1
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨  p_82 ∨ -b^{2, 42}_0
c  in DIMACS:
-4769  4770 -4771  82  4772 0
-4769  4770 -4771  82  4773 0
-4769  4770 -4771  82 -4774 0

c  -2-1 --> break 
c    ( b^{2, 41}_2 ∧  b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧ -p_82) -> break
c  in CNF:
c    -b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨  b^{2, 41}_0 ∨  p_82 ∨ break
c  in DIMACS:
-4769 -4770  4771  82 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 41}_2 ∧ -b^{2, 41}_1 ∧ -b^{2, 41}_0 ∧ true) 
c  in CNF:
c    -b^{2, 41}_2 ∨  b^{2, 41}_1 ∨  b^{2, 41}_0 ∨ false 
c  in DIMACS:
-4769  4770  4771  0

c  3 does not represent an automaton state.
c    -(-b^{2, 41}_2 ∧  b^{2, 41}_1 ∧  b^{2, 41}_0 ∧ true) 
c  in CNF:
c     b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ false 
c  in DIMACS:
 4769 -4770 -4771  0
c  -3 does not represent an automaton state.
c    -( b^{2, 41}_2 ∧  b^{2, 41}_1 ∧  b^{2, 41}_0 ∧ true) 
c  in CNF:
c    -b^{2, 41}_2 ∨ -b^{2, 41}_1 ∨ -b^{2, 41}_0 ∨ false 
c  in DIMACS:
-4769 -4770 -4771  0

c i = 42
c  -2+1 --> -1
c    ( b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧  p_84) -> ( b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0)
c  in CNF:
c    -b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨  b^{2, 43}_2
c    -b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_1
c    -b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨  b^{2, 43}_0
c  in DIMACS:
-4772 -4773  4774 -84  4775 0
-4772 -4773  4774 -84 -4776 0
-4772 -4773  4774 -84  4777 0

c  -1+1 --> 0
c    ( b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0 ∧  p_84) -> (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧ -b^{2, 43}_0)
c  in CNF:
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_2
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_1
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_0
c  in DIMACS:
-4772  4773 -4774 -84 -4775 0
-4772  4773 -4774 -84 -4776 0
-4772  4773 -4774 -84 -4777 0

c  0+1 --> 1
c    (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧  p_84) -> (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0)
c  in CNF:
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_2
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_1
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨  b^{2, 43}_0
c  in DIMACS:
 4772  4773  4774 -84 -4775 0
 4772  4773  4774 -84 -4776 0
 4772  4773  4774 -84  4777 0

c  1+1 --> 2
c    (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0 ∧  p_84) -> (-b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0)
c  in CNF:
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_2
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨  b^{2, 43}_1
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ -p_84 ∨ -b^{2, 43}_0
c  in DIMACS:
 4772  4773 -4774 -84 -4775 0
 4772  4773 -4774 -84  4776 0
 4772  4773 -4774 -84 -4777 0

c  2+1 --> break 
c    (-b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧  p_84) -> break
c  in CNF:
c     b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 4772 -4773  4774 -84 1162 0


c  2-1 --> 1
c    (-b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧ -p_84) -> (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0)
c  in CNF:
c     b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_2
c     b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_1
c     b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨  b^{2, 43}_0
c  in DIMACS:
 4772 -4773  4774  84 -4775 0
 4772 -4773  4774  84 -4776 0
 4772 -4773  4774  84  4777 0

c  1-1 --> 0
c    (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0 ∧ -p_84) -> (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧ -b^{2, 43}_0)
c  in CNF:
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_2
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_1
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_0
c  in DIMACS:
 4772  4773 -4774  84 -4775 0
 4772  4773 -4774  84 -4776 0
 4772  4773 -4774  84 -4777 0

c  0-1 --> -1
c    (-b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧ -p_84) -> ( b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0)
c  in CNF:
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨  b^{2, 43}_2
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_1
c     b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨  b^{2, 43}_0
c  in DIMACS:
 4772  4773  4774  84  4775 0
 4772  4773  4774  84 -4776 0
 4772  4773  4774  84  4777 0

c  -1-1 --> -2
c    ( b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧  b^{2, 42}_0 ∧ -p_84) -> ( b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0)
c  in CNF:
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨  b^{2, 43}_2
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨  b^{2, 43}_1
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨  p_84 ∨ -b^{2, 43}_0
c  in DIMACS:
-4772  4773 -4774  84  4775 0
-4772  4773 -4774  84  4776 0
-4772  4773 -4774  84 -4777 0

c  -2-1 --> break 
c    ( b^{2, 42}_2 ∧  b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨  b^{2, 42}_0 ∨  p_84 ∨ break
c  in DIMACS:
-4772 -4773  4774  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 42}_2 ∧ -b^{2, 42}_1 ∧ -b^{2, 42}_0 ∧ true) 
c  in CNF:
c    -b^{2, 42}_2 ∨  b^{2, 42}_1 ∨  b^{2, 42}_0 ∨ false 
c  in DIMACS:
-4772  4773  4774  0

c  3 does not represent an automaton state.
c    -(-b^{2, 42}_2 ∧  b^{2, 42}_1 ∧  b^{2, 42}_0 ∧ true) 
c  in CNF:
c     b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ false 
c  in DIMACS:
 4772 -4773 -4774  0
c  -3 does not represent an automaton state.
c    -( b^{2, 42}_2 ∧  b^{2, 42}_1 ∧  b^{2, 42}_0 ∧ true) 
c  in CNF:
c    -b^{2, 42}_2 ∨ -b^{2, 42}_1 ∨ -b^{2, 42}_0 ∨ false 
c  in DIMACS:
-4772 -4773 -4774  0

c i = 43
c  -2+1 --> -1
c    ( b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧  p_86) -> ( b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0)
c  in CNF:
c    -b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨  b^{2, 44}_2
c    -b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_1
c    -b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨  b^{2, 44}_0
c  in DIMACS:
-4775 -4776  4777 -86  4778 0
-4775 -4776  4777 -86 -4779 0
-4775 -4776  4777 -86  4780 0

c  -1+1 --> 0
c    ( b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0 ∧  p_86) -> (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧ -b^{2, 44}_0)
c  in CNF:
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_2
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_1
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_0
c  in DIMACS:
-4775  4776 -4777 -86 -4778 0
-4775  4776 -4777 -86 -4779 0
-4775  4776 -4777 -86 -4780 0

c  0+1 --> 1
c    (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧  p_86) -> (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0)
c  in CNF:
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_2
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_1
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨  b^{2, 44}_0
c  in DIMACS:
 4775  4776  4777 -86 -4778 0
 4775  4776  4777 -86 -4779 0
 4775  4776  4777 -86  4780 0

c  1+1 --> 2
c    (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0 ∧  p_86) -> (-b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0)
c  in CNF:
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_2
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨  b^{2, 44}_1
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ -p_86 ∨ -b^{2, 44}_0
c  in DIMACS:
 4775  4776 -4777 -86 -4778 0
 4775  4776 -4777 -86  4779 0
 4775  4776 -4777 -86 -4780 0

c  2+1 --> break 
c    (-b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧  p_86) -> break
c  in CNF:
c     b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ -p_86 ∨ break
c  in DIMACS:
 4775 -4776  4777 -86 1162 0


c  2-1 --> 1
c    (-b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧ -p_86) -> (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0)
c  in CNF:
c     b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_2
c     b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_1
c     b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨  b^{2, 44}_0
c  in DIMACS:
 4775 -4776  4777  86 -4778 0
 4775 -4776  4777  86 -4779 0
 4775 -4776  4777  86  4780 0

c  1-1 --> 0
c    (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0 ∧ -p_86) -> (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧ -b^{2, 44}_0)
c  in CNF:
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_2
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_1
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_0
c  in DIMACS:
 4775  4776 -4777  86 -4778 0
 4775  4776 -4777  86 -4779 0
 4775  4776 -4777  86 -4780 0

c  0-1 --> -1
c    (-b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧ -p_86) -> ( b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0)
c  in CNF:
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨  b^{2, 44}_2
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_1
c     b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨  b^{2, 44}_0
c  in DIMACS:
 4775  4776  4777  86  4778 0
 4775  4776  4777  86 -4779 0
 4775  4776  4777  86  4780 0

c  -1-1 --> -2
c    ( b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧  b^{2, 43}_0 ∧ -p_86) -> ( b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0)
c  in CNF:
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨  b^{2, 44}_2
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨  b^{2, 44}_1
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨  p_86 ∨ -b^{2, 44}_0
c  in DIMACS:
-4775  4776 -4777  86  4778 0
-4775  4776 -4777  86  4779 0
-4775  4776 -4777  86 -4780 0

c  -2-1 --> break 
c    ( b^{2, 43}_2 ∧  b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧ -p_86) -> break
c  in CNF:
c    -b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨  b^{2, 43}_0 ∨  p_86 ∨ break
c  in DIMACS:
-4775 -4776  4777  86 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 43}_2 ∧ -b^{2, 43}_1 ∧ -b^{2, 43}_0 ∧ true) 
c  in CNF:
c    -b^{2, 43}_2 ∨  b^{2, 43}_1 ∨  b^{2, 43}_0 ∨ false 
c  in DIMACS:
-4775  4776  4777  0

c  3 does not represent an automaton state.
c    -(-b^{2, 43}_2 ∧  b^{2, 43}_1 ∧  b^{2, 43}_0 ∧ true) 
c  in CNF:
c     b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ false 
c  in DIMACS:
 4775 -4776 -4777  0
c  -3 does not represent an automaton state.
c    -( b^{2, 43}_2 ∧  b^{2, 43}_1 ∧  b^{2, 43}_0 ∧ true) 
c  in CNF:
c    -b^{2, 43}_2 ∨ -b^{2, 43}_1 ∨ -b^{2, 43}_0 ∨ false 
c  in DIMACS:
-4775 -4776 -4777  0

c i = 44
c  -2+1 --> -1
c    ( b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧  p_88) -> ( b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0)
c  in CNF:
c    -b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨  b^{2, 45}_2
c    -b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_1
c    -b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨  b^{2, 45}_0
c  in DIMACS:
-4778 -4779  4780 -88  4781 0
-4778 -4779  4780 -88 -4782 0
-4778 -4779  4780 -88  4783 0

c  -1+1 --> 0
c    ( b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0 ∧  p_88) -> (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧ -b^{2, 45}_0)
c  in CNF:
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_2
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_1
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_0
c  in DIMACS:
-4778  4779 -4780 -88 -4781 0
-4778  4779 -4780 -88 -4782 0
-4778  4779 -4780 -88 -4783 0

c  0+1 --> 1
c    (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧  p_88) -> (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0)
c  in CNF:
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_2
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_1
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨  b^{2, 45}_0
c  in DIMACS:
 4778  4779  4780 -88 -4781 0
 4778  4779  4780 -88 -4782 0
 4778  4779  4780 -88  4783 0

c  1+1 --> 2
c    (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0 ∧  p_88) -> (-b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0)
c  in CNF:
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_2
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨  b^{2, 45}_1
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ -p_88 ∨ -b^{2, 45}_0
c  in DIMACS:
 4778  4779 -4780 -88 -4781 0
 4778  4779 -4780 -88  4782 0
 4778  4779 -4780 -88 -4783 0

c  2+1 --> break 
c    (-b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧  p_88) -> break
c  in CNF:
c     b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 4778 -4779  4780 -88 1162 0


c  2-1 --> 1
c    (-b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧ -p_88) -> (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0)
c  in CNF:
c     b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_2
c     b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_1
c     b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨  b^{2, 45}_0
c  in DIMACS:
 4778 -4779  4780  88 -4781 0
 4778 -4779  4780  88 -4782 0
 4778 -4779  4780  88  4783 0

c  1-1 --> 0
c    (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0 ∧ -p_88) -> (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧ -b^{2, 45}_0)
c  in CNF:
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_2
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_1
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_0
c  in DIMACS:
 4778  4779 -4780  88 -4781 0
 4778  4779 -4780  88 -4782 0
 4778  4779 -4780  88 -4783 0

c  0-1 --> -1
c    (-b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧ -p_88) -> ( b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0)
c  in CNF:
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨  b^{2, 45}_2
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_1
c     b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨  b^{2, 45}_0
c  in DIMACS:
 4778  4779  4780  88  4781 0
 4778  4779  4780  88 -4782 0
 4778  4779  4780  88  4783 0

c  -1-1 --> -2
c    ( b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧  b^{2, 44}_0 ∧ -p_88) -> ( b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0)
c  in CNF:
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨  b^{2, 45}_2
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨  b^{2, 45}_1
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨  p_88 ∨ -b^{2, 45}_0
c  in DIMACS:
-4778  4779 -4780  88  4781 0
-4778  4779 -4780  88  4782 0
-4778  4779 -4780  88 -4783 0

c  -2-1 --> break 
c    ( b^{2, 44}_2 ∧  b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨  b^{2, 44}_0 ∨  p_88 ∨ break
c  in DIMACS:
-4778 -4779  4780  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 44}_2 ∧ -b^{2, 44}_1 ∧ -b^{2, 44}_0 ∧ true) 
c  in CNF:
c    -b^{2, 44}_2 ∨  b^{2, 44}_1 ∨  b^{2, 44}_0 ∨ false 
c  in DIMACS:
-4778  4779  4780  0

c  3 does not represent an automaton state.
c    -(-b^{2, 44}_2 ∧  b^{2, 44}_1 ∧  b^{2, 44}_0 ∧ true) 
c  in CNF:
c     b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ false 
c  in DIMACS:
 4778 -4779 -4780  0
c  -3 does not represent an automaton state.
c    -( b^{2, 44}_2 ∧  b^{2, 44}_1 ∧  b^{2, 44}_0 ∧ true) 
c  in CNF:
c    -b^{2, 44}_2 ∨ -b^{2, 44}_1 ∨ -b^{2, 44}_0 ∨ false 
c  in DIMACS:
-4778 -4779 -4780  0

c i = 45
c  -2+1 --> -1
c    ( b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧  p_90) -> ( b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0)
c  in CNF:
c    -b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨  b^{2, 46}_2
c    -b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_1
c    -b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨  b^{2, 46}_0
c  in DIMACS:
-4781 -4782  4783 -90  4784 0
-4781 -4782  4783 -90 -4785 0
-4781 -4782  4783 -90  4786 0

c  -1+1 --> 0
c    ( b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0 ∧  p_90) -> (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧ -b^{2, 46}_0)
c  in CNF:
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_2
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_1
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_0
c  in DIMACS:
-4781  4782 -4783 -90 -4784 0
-4781  4782 -4783 -90 -4785 0
-4781  4782 -4783 -90 -4786 0

c  0+1 --> 1
c    (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧  p_90) -> (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0)
c  in CNF:
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_2
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_1
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨  b^{2, 46}_0
c  in DIMACS:
 4781  4782  4783 -90 -4784 0
 4781  4782  4783 -90 -4785 0
 4781  4782  4783 -90  4786 0

c  1+1 --> 2
c    (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0 ∧  p_90) -> (-b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0)
c  in CNF:
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_2
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨  b^{2, 46}_1
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ -p_90 ∨ -b^{2, 46}_0
c  in DIMACS:
 4781  4782 -4783 -90 -4784 0
 4781  4782 -4783 -90  4785 0
 4781  4782 -4783 -90 -4786 0

c  2+1 --> break 
c    (-b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧  p_90) -> break
c  in CNF:
c     b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 4781 -4782  4783 -90 1162 0


c  2-1 --> 1
c    (-b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧ -p_90) -> (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0)
c  in CNF:
c     b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_2
c     b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_1
c     b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨  b^{2, 46}_0
c  in DIMACS:
 4781 -4782  4783  90 -4784 0
 4781 -4782  4783  90 -4785 0
 4781 -4782  4783  90  4786 0

c  1-1 --> 0
c    (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0 ∧ -p_90) -> (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧ -b^{2, 46}_0)
c  in CNF:
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_2
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_1
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_0
c  in DIMACS:
 4781  4782 -4783  90 -4784 0
 4781  4782 -4783  90 -4785 0
 4781  4782 -4783  90 -4786 0

c  0-1 --> -1
c    (-b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧ -p_90) -> ( b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0)
c  in CNF:
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨  b^{2, 46}_2
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_1
c     b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨  b^{2, 46}_0
c  in DIMACS:
 4781  4782  4783  90  4784 0
 4781  4782  4783  90 -4785 0
 4781  4782  4783  90  4786 0

c  -1-1 --> -2
c    ( b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧  b^{2, 45}_0 ∧ -p_90) -> ( b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0)
c  in CNF:
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨  b^{2, 46}_2
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨  b^{2, 46}_1
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨  p_90 ∨ -b^{2, 46}_0
c  in DIMACS:
-4781  4782 -4783  90  4784 0
-4781  4782 -4783  90  4785 0
-4781  4782 -4783  90 -4786 0

c  -2-1 --> break 
c    ( b^{2, 45}_2 ∧  b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨  b^{2, 45}_0 ∨  p_90 ∨ break
c  in DIMACS:
-4781 -4782  4783  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 45}_2 ∧ -b^{2, 45}_1 ∧ -b^{2, 45}_0 ∧ true) 
c  in CNF:
c    -b^{2, 45}_2 ∨  b^{2, 45}_1 ∨  b^{2, 45}_0 ∨ false 
c  in DIMACS:
-4781  4782  4783  0

c  3 does not represent an automaton state.
c    -(-b^{2, 45}_2 ∧  b^{2, 45}_1 ∧  b^{2, 45}_0 ∧ true) 
c  in CNF:
c     b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ false 
c  in DIMACS:
 4781 -4782 -4783  0
c  -3 does not represent an automaton state.
c    -( b^{2, 45}_2 ∧  b^{2, 45}_1 ∧  b^{2, 45}_0 ∧ true) 
c  in CNF:
c    -b^{2, 45}_2 ∨ -b^{2, 45}_1 ∨ -b^{2, 45}_0 ∨ false 
c  in DIMACS:
-4781 -4782 -4783  0

c i = 46
c  -2+1 --> -1
c    ( b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧  p_92) -> ( b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0)
c  in CNF:
c    -b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨  b^{2, 47}_2
c    -b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_1
c    -b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨  b^{2, 47}_0
c  in DIMACS:
-4784 -4785  4786 -92  4787 0
-4784 -4785  4786 -92 -4788 0
-4784 -4785  4786 -92  4789 0

c  -1+1 --> 0
c    ( b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0 ∧  p_92) -> (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧ -b^{2, 47}_0)
c  in CNF:
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_2
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_1
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_0
c  in DIMACS:
-4784  4785 -4786 -92 -4787 0
-4784  4785 -4786 -92 -4788 0
-4784  4785 -4786 -92 -4789 0

c  0+1 --> 1
c    (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧  p_92) -> (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0)
c  in CNF:
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_2
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_1
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨  b^{2, 47}_0
c  in DIMACS:
 4784  4785  4786 -92 -4787 0
 4784  4785  4786 -92 -4788 0
 4784  4785  4786 -92  4789 0

c  1+1 --> 2
c    (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0 ∧  p_92) -> (-b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0)
c  in CNF:
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_2
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨  b^{2, 47}_1
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ -p_92 ∨ -b^{2, 47}_0
c  in DIMACS:
 4784  4785 -4786 -92 -4787 0
 4784  4785 -4786 -92  4788 0
 4784  4785 -4786 -92 -4789 0

c  2+1 --> break 
c    (-b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧  p_92) -> break
c  in CNF:
c     b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 4784 -4785  4786 -92 1162 0


c  2-1 --> 1
c    (-b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧ -p_92) -> (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0)
c  in CNF:
c     b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_2
c     b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_1
c     b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨  b^{2, 47}_0
c  in DIMACS:
 4784 -4785  4786  92 -4787 0
 4784 -4785  4786  92 -4788 0
 4784 -4785  4786  92  4789 0

c  1-1 --> 0
c    (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0 ∧ -p_92) -> (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧ -b^{2, 47}_0)
c  in CNF:
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_2
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_1
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_0
c  in DIMACS:
 4784  4785 -4786  92 -4787 0
 4784  4785 -4786  92 -4788 0
 4784  4785 -4786  92 -4789 0

c  0-1 --> -1
c    (-b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧ -p_92) -> ( b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0)
c  in CNF:
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨  b^{2, 47}_2
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_1
c     b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨  b^{2, 47}_0
c  in DIMACS:
 4784  4785  4786  92  4787 0
 4784  4785  4786  92 -4788 0
 4784  4785  4786  92  4789 0

c  -1-1 --> -2
c    ( b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧  b^{2, 46}_0 ∧ -p_92) -> ( b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0)
c  in CNF:
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨  b^{2, 47}_2
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨  b^{2, 47}_1
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨  p_92 ∨ -b^{2, 47}_0
c  in DIMACS:
-4784  4785 -4786  92  4787 0
-4784  4785 -4786  92  4788 0
-4784  4785 -4786  92 -4789 0

c  -2-1 --> break 
c    ( b^{2, 46}_2 ∧  b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨  b^{2, 46}_0 ∨  p_92 ∨ break
c  in DIMACS:
-4784 -4785  4786  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 46}_2 ∧ -b^{2, 46}_1 ∧ -b^{2, 46}_0 ∧ true) 
c  in CNF:
c    -b^{2, 46}_2 ∨  b^{2, 46}_1 ∨  b^{2, 46}_0 ∨ false 
c  in DIMACS:
-4784  4785  4786  0

c  3 does not represent an automaton state.
c    -(-b^{2, 46}_2 ∧  b^{2, 46}_1 ∧  b^{2, 46}_0 ∧ true) 
c  in CNF:
c     b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ false 
c  in DIMACS:
 4784 -4785 -4786  0
c  -3 does not represent an automaton state.
c    -( b^{2, 46}_2 ∧  b^{2, 46}_1 ∧  b^{2, 46}_0 ∧ true) 
c  in CNF:
c    -b^{2, 46}_2 ∨ -b^{2, 46}_1 ∨ -b^{2, 46}_0 ∨ false 
c  in DIMACS:
-4784 -4785 -4786  0

c i = 47
c  -2+1 --> -1
c    ( b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧  p_94) -> ( b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0)
c  in CNF:
c    -b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨  b^{2, 48}_2
c    -b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_1
c    -b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨  b^{2, 48}_0
c  in DIMACS:
-4787 -4788  4789 -94  4790 0
-4787 -4788  4789 -94 -4791 0
-4787 -4788  4789 -94  4792 0

c  -1+1 --> 0
c    ( b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0 ∧  p_94) -> (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧ -b^{2, 48}_0)
c  in CNF:
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_2
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_1
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_0
c  in DIMACS:
-4787  4788 -4789 -94 -4790 0
-4787  4788 -4789 -94 -4791 0
-4787  4788 -4789 -94 -4792 0

c  0+1 --> 1
c    (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧  p_94) -> (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0)
c  in CNF:
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_2
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_1
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨  b^{2, 48}_0
c  in DIMACS:
 4787  4788  4789 -94 -4790 0
 4787  4788  4789 -94 -4791 0
 4787  4788  4789 -94  4792 0

c  1+1 --> 2
c    (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0 ∧  p_94) -> (-b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0)
c  in CNF:
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_2
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨  b^{2, 48}_1
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ -p_94 ∨ -b^{2, 48}_0
c  in DIMACS:
 4787  4788 -4789 -94 -4790 0
 4787  4788 -4789 -94  4791 0
 4787  4788 -4789 -94 -4792 0

c  2+1 --> break 
c    (-b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧  p_94) -> break
c  in CNF:
c     b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ -p_94 ∨ break
c  in DIMACS:
 4787 -4788  4789 -94 1162 0


c  2-1 --> 1
c    (-b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧ -p_94) -> (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0)
c  in CNF:
c     b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_2
c     b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_1
c     b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨  b^{2, 48}_0
c  in DIMACS:
 4787 -4788  4789  94 -4790 0
 4787 -4788  4789  94 -4791 0
 4787 -4788  4789  94  4792 0

c  1-1 --> 0
c    (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0 ∧ -p_94) -> (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧ -b^{2, 48}_0)
c  in CNF:
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_2
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_1
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_0
c  in DIMACS:
 4787  4788 -4789  94 -4790 0
 4787  4788 -4789  94 -4791 0
 4787  4788 -4789  94 -4792 0

c  0-1 --> -1
c    (-b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧ -p_94) -> ( b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0)
c  in CNF:
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨  b^{2, 48}_2
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_1
c     b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨  b^{2, 48}_0
c  in DIMACS:
 4787  4788  4789  94  4790 0
 4787  4788  4789  94 -4791 0
 4787  4788  4789  94  4792 0

c  -1-1 --> -2
c    ( b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧  b^{2, 47}_0 ∧ -p_94) -> ( b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0)
c  in CNF:
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨  b^{2, 48}_2
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨  b^{2, 48}_1
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨  p_94 ∨ -b^{2, 48}_0
c  in DIMACS:
-4787  4788 -4789  94  4790 0
-4787  4788 -4789  94  4791 0
-4787  4788 -4789  94 -4792 0

c  -2-1 --> break 
c    ( b^{2, 47}_2 ∧  b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧ -p_94) -> break
c  in CNF:
c    -b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨  b^{2, 47}_0 ∨  p_94 ∨ break
c  in DIMACS:
-4787 -4788  4789  94 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 47}_2 ∧ -b^{2, 47}_1 ∧ -b^{2, 47}_0 ∧ true) 
c  in CNF:
c    -b^{2, 47}_2 ∨  b^{2, 47}_1 ∨  b^{2, 47}_0 ∨ false 
c  in DIMACS:
-4787  4788  4789  0

c  3 does not represent an automaton state.
c    -(-b^{2, 47}_2 ∧  b^{2, 47}_1 ∧  b^{2, 47}_0 ∧ true) 
c  in CNF:
c     b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ false 
c  in DIMACS:
 4787 -4788 -4789  0
c  -3 does not represent an automaton state.
c    -( b^{2, 47}_2 ∧  b^{2, 47}_1 ∧  b^{2, 47}_0 ∧ true) 
c  in CNF:
c    -b^{2, 47}_2 ∨ -b^{2, 47}_1 ∨ -b^{2, 47}_0 ∨ false 
c  in DIMACS:
-4787 -4788 -4789  0

c i = 48
c  -2+1 --> -1
c    ( b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧  p_96) -> ( b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0)
c  in CNF:
c    -b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨  b^{2, 49}_2
c    -b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_1
c    -b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨  b^{2, 49}_0
c  in DIMACS:
-4790 -4791  4792 -96  4793 0
-4790 -4791  4792 -96 -4794 0
-4790 -4791  4792 -96  4795 0

c  -1+1 --> 0
c    ( b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0 ∧  p_96) -> (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧ -b^{2, 49}_0)
c  in CNF:
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_2
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_1
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_0
c  in DIMACS:
-4790  4791 -4792 -96 -4793 0
-4790  4791 -4792 -96 -4794 0
-4790  4791 -4792 -96 -4795 0

c  0+1 --> 1
c    (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧  p_96) -> (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0)
c  in CNF:
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_2
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_1
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨  b^{2, 49}_0
c  in DIMACS:
 4790  4791  4792 -96 -4793 0
 4790  4791  4792 -96 -4794 0
 4790  4791  4792 -96  4795 0

c  1+1 --> 2
c    (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0 ∧  p_96) -> (-b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0)
c  in CNF:
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_2
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨  b^{2, 49}_1
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ -p_96 ∨ -b^{2, 49}_0
c  in DIMACS:
 4790  4791 -4792 -96 -4793 0
 4790  4791 -4792 -96  4794 0
 4790  4791 -4792 -96 -4795 0

c  2+1 --> break 
c    (-b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧  p_96) -> break
c  in CNF:
c     b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 4790 -4791  4792 -96 1162 0


c  2-1 --> 1
c    (-b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧ -p_96) -> (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0)
c  in CNF:
c     b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_2
c     b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_1
c     b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨  b^{2, 49}_0
c  in DIMACS:
 4790 -4791  4792  96 -4793 0
 4790 -4791  4792  96 -4794 0
 4790 -4791  4792  96  4795 0

c  1-1 --> 0
c    (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0 ∧ -p_96) -> (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧ -b^{2, 49}_0)
c  in CNF:
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_2
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_1
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_0
c  in DIMACS:
 4790  4791 -4792  96 -4793 0
 4790  4791 -4792  96 -4794 0
 4790  4791 -4792  96 -4795 0

c  0-1 --> -1
c    (-b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧ -p_96) -> ( b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0)
c  in CNF:
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨  b^{2, 49}_2
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_1
c     b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨  b^{2, 49}_0
c  in DIMACS:
 4790  4791  4792  96  4793 0
 4790  4791  4792  96 -4794 0
 4790  4791  4792  96  4795 0

c  -1-1 --> -2
c    ( b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧  b^{2, 48}_0 ∧ -p_96) -> ( b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0)
c  in CNF:
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨  b^{2, 49}_2
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨  b^{2, 49}_1
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨  p_96 ∨ -b^{2, 49}_0
c  in DIMACS:
-4790  4791 -4792  96  4793 0
-4790  4791 -4792  96  4794 0
-4790  4791 -4792  96 -4795 0

c  -2-1 --> break 
c    ( b^{2, 48}_2 ∧  b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨  b^{2, 48}_0 ∨  p_96 ∨ break
c  in DIMACS:
-4790 -4791  4792  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 48}_2 ∧ -b^{2, 48}_1 ∧ -b^{2, 48}_0 ∧ true) 
c  in CNF:
c    -b^{2, 48}_2 ∨  b^{2, 48}_1 ∨  b^{2, 48}_0 ∨ false 
c  in DIMACS:
-4790  4791  4792  0

c  3 does not represent an automaton state.
c    -(-b^{2, 48}_2 ∧  b^{2, 48}_1 ∧  b^{2, 48}_0 ∧ true) 
c  in CNF:
c     b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ false 
c  in DIMACS:
 4790 -4791 -4792  0
c  -3 does not represent an automaton state.
c    -( b^{2, 48}_2 ∧  b^{2, 48}_1 ∧  b^{2, 48}_0 ∧ true) 
c  in CNF:
c    -b^{2, 48}_2 ∨ -b^{2, 48}_1 ∨ -b^{2, 48}_0 ∨ false 
c  in DIMACS:
-4790 -4791 -4792  0

c i = 49
c  -2+1 --> -1
c    ( b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧  p_98) -> ( b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0)
c  in CNF:
c    -b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨  b^{2, 50}_2
c    -b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_1
c    -b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨  b^{2, 50}_0
c  in DIMACS:
-4793 -4794  4795 -98  4796 0
-4793 -4794  4795 -98 -4797 0
-4793 -4794  4795 -98  4798 0

c  -1+1 --> 0
c    ( b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0 ∧  p_98) -> (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧ -b^{2, 50}_0)
c  in CNF:
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_2
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_1
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_0
c  in DIMACS:
-4793  4794 -4795 -98 -4796 0
-4793  4794 -4795 -98 -4797 0
-4793  4794 -4795 -98 -4798 0

c  0+1 --> 1
c    (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧  p_98) -> (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0)
c  in CNF:
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_2
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_1
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨  b^{2, 50}_0
c  in DIMACS:
 4793  4794  4795 -98 -4796 0
 4793  4794  4795 -98 -4797 0
 4793  4794  4795 -98  4798 0

c  1+1 --> 2
c    (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0 ∧  p_98) -> (-b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0)
c  in CNF:
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_2
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨  b^{2, 50}_1
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ -p_98 ∨ -b^{2, 50}_0
c  in DIMACS:
 4793  4794 -4795 -98 -4796 0
 4793  4794 -4795 -98  4797 0
 4793  4794 -4795 -98 -4798 0

c  2+1 --> break 
c    (-b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧  p_98) -> break
c  in CNF:
c     b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 4793 -4794  4795 -98 1162 0


c  2-1 --> 1
c    (-b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧ -p_98) -> (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0)
c  in CNF:
c     b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_2
c     b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_1
c     b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨  b^{2, 50}_0
c  in DIMACS:
 4793 -4794  4795  98 -4796 0
 4793 -4794  4795  98 -4797 0
 4793 -4794  4795  98  4798 0

c  1-1 --> 0
c    (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0 ∧ -p_98) -> (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧ -b^{2, 50}_0)
c  in CNF:
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_2
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_1
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_0
c  in DIMACS:
 4793  4794 -4795  98 -4796 0
 4793  4794 -4795  98 -4797 0
 4793  4794 -4795  98 -4798 0

c  0-1 --> -1
c    (-b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧ -p_98) -> ( b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0)
c  in CNF:
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨  b^{2, 50}_2
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_1
c     b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨  b^{2, 50}_0
c  in DIMACS:
 4793  4794  4795  98  4796 0
 4793  4794  4795  98 -4797 0
 4793  4794  4795  98  4798 0

c  -1-1 --> -2
c    ( b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧  b^{2, 49}_0 ∧ -p_98) -> ( b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0)
c  in CNF:
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨  b^{2, 50}_2
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨  b^{2, 50}_1
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨  p_98 ∨ -b^{2, 50}_0
c  in DIMACS:
-4793  4794 -4795  98  4796 0
-4793  4794 -4795  98  4797 0
-4793  4794 -4795  98 -4798 0

c  -2-1 --> break 
c    ( b^{2, 49}_2 ∧  b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨  b^{2, 49}_0 ∨  p_98 ∨ break
c  in DIMACS:
-4793 -4794  4795  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 49}_2 ∧ -b^{2, 49}_1 ∧ -b^{2, 49}_0 ∧ true) 
c  in CNF:
c    -b^{2, 49}_2 ∨  b^{2, 49}_1 ∨  b^{2, 49}_0 ∨ false 
c  in DIMACS:
-4793  4794  4795  0

c  3 does not represent an automaton state.
c    -(-b^{2, 49}_2 ∧  b^{2, 49}_1 ∧  b^{2, 49}_0 ∧ true) 
c  in CNF:
c     b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ false 
c  in DIMACS:
 4793 -4794 -4795  0
c  -3 does not represent an automaton state.
c    -( b^{2, 49}_2 ∧  b^{2, 49}_1 ∧  b^{2, 49}_0 ∧ true) 
c  in CNF:
c    -b^{2, 49}_2 ∨ -b^{2, 49}_1 ∨ -b^{2, 49}_0 ∨ false 
c  in DIMACS:
-4793 -4794 -4795  0

c i = 50
c  -2+1 --> -1
c    ( b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧  p_100) -> ( b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0)
c  in CNF:
c    -b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨  b^{2, 51}_2
c    -b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_1
c    -b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨  b^{2, 51}_0
c  in DIMACS:
-4796 -4797  4798 -100  4799 0
-4796 -4797  4798 -100 -4800 0
-4796 -4797  4798 -100  4801 0

c  -1+1 --> 0
c    ( b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0 ∧  p_100) -> (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧ -b^{2, 51}_0)
c  in CNF:
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_2
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_1
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_0
c  in DIMACS:
-4796  4797 -4798 -100 -4799 0
-4796  4797 -4798 -100 -4800 0
-4796  4797 -4798 -100 -4801 0

c  0+1 --> 1
c    (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧  p_100) -> (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0)
c  in CNF:
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_2
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_1
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨  b^{2, 51}_0
c  in DIMACS:
 4796  4797  4798 -100 -4799 0
 4796  4797  4798 -100 -4800 0
 4796  4797  4798 -100  4801 0

c  1+1 --> 2
c    (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0 ∧  p_100) -> (-b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0)
c  in CNF:
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_2
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨  b^{2, 51}_1
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ -p_100 ∨ -b^{2, 51}_0
c  in DIMACS:
 4796  4797 -4798 -100 -4799 0
 4796  4797 -4798 -100  4800 0
 4796  4797 -4798 -100 -4801 0

c  2+1 --> break 
c    (-b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧  p_100) -> break
c  in CNF:
c     b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 4796 -4797  4798 -100 1162 0


c  2-1 --> 1
c    (-b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧ -p_100) -> (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0)
c  in CNF:
c     b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_2
c     b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_1
c     b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨  b^{2, 51}_0
c  in DIMACS:
 4796 -4797  4798  100 -4799 0
 4796 -4797  4798  100 -4800 0
 4796 -4797  4798  100  4801 0

c  1-1 --> 0
c    (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0 ∧ -p_100) -> (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧ -b^{2, 51}_0)
c  in CNF:
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_2
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_1
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_0
c  in DIMACS:
 4796  4797 -4798  100 -4799 0
 4796  4797 -4798  100 -4800 0
 4796  4797 -4798  100 -4801 0

c  0-1 --> -1
c    (-b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧ -p_100) -> ( b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0)
c  in CNF:
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨  b^{2, 51}_2
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_1
c     b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨  b^{2, 51}_0
c  in DIMACS:
 4796  4797  4798  100  4799 0
 4796  4797  4798  100 -4800 0
 4796  4797  4798  100  4801 0

c  -1-1 --> -2
c    ( b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧  b^{2, 50}_0 ∧ -p_100) -> ( b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0)
c  in CNF:
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨  b^{2, 51}_2
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨  b^{2, 51}_1
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨  p_100 ∨ -b^{2, 51}_0
c  in DIMACS:
-4796  4797 -4798  100  4799 0
-4796  4797 -4798  100  4800 0
-4796  4797 -4798  100 -4801 0

c  -2-1 --> break 
c    ( b^{2, 50}_2 ∧  b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨  b^{2, 50}_0 ∨  p_100 ∨ break
c  in DIMACS:
-4796 -4797  4798  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 50}_2 ∧ -b^{2, 50}_1 ∧ -b^{2, 50}_0 ∧ true) 
c  in CNF:
c    -b^{2, 50}_2 ∨  b^{2, 50}_1 ∨  b^{2, 50}_0 ∨ false 
c  in DIMACS:
-4796  4797  4798  0

c  3 does not represent an automaton state.
c    -(-b^{2, 50}_2 ∧  b^{2, 50}_1 ∧  b^{2, 50}_0 ∧ true) 
c  in CNF:
c     b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ false 
c  in DIMACS:
 4796 -4797 -4798  0
c  -3 does not represent an automaton state.
c    -( b^{2, 50}_2 ∧  b^{2, 50}_1 ∧  b^{2, 50}_0 ∧ true) 
c  in CNF:
c    -b^{2, 50}_2 ∨ -b^{2, 50}_1 ∨ -b^{2, 50}_0 ∨ false 
c  in DIMACS:
-4796 -4797 -4798  0

c i = 51
c  -2+1 --> -1
c    ( b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧  p_102) -> ( b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0)
c  in CNF:
c    -b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨  b^{2, 52}_2
c    -b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_1
c    -b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨  b^{2, 52}_0
c  in DIMACS:
-4799 -4800  4801 -102  4802 0
-4799 -4800  4801 -102 -4803 0
-4799 -4800  4801 -102  4804 0

c  -1+1 --> 0
c    ( b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0 ∧  p_102) -> (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧ -b^{2, 52}_0)
c  in CNF:
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_2
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_1
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_0
c  in DIMACS:
-4799  4800 -4801 -102 -4802 0
-4799  4800 -4801 -102 -4803 0
-4799  4800 -4801 -102 -4804 0

c  0+1 --> 1
c    (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧  p_102) -> (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0)
c  in CNF:
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_2
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_1
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨  b^{2, 52}_0
c  in DIMACS:
 4799  4800  4801 -102 -4802 0
 4799  4800  4801 -102 -4803 0
 4799  4800  4801 -102  4804 0

c  1+1 --> 2
c    (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0 ∧  p_102) -> (-b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0)
c  in CNF:
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_2
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨  b^{2, 52}_1
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ -p_102 ∨ -b^{2, 52}_0
c  in DIMACS:
 4799  4800 -4801 -102 -4802 0
 4799  4800 -4801 -102  4803 0
 4799  4800 -4801 -102 -4804 0

c  2+1 --> break 
c    (-b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧  p_102) -> break
c  in CNF:
c     b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 4799 -4800  4801 -102 1162 0


c  2-1 --> 1
c    (-b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧ -p_102) -> (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0)
c  in CNF:
c     b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_2
c     b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_1
c     b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨  b^{2, 52}_0
c  in DIMACS:
 4799 -4800  4801  102 -4802 0
 4799 -4800  4801  102 -4803 0
 4799 -4800  4801  102  4804 0

c  1-1 --> 0
c    (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0 ∧ -p_102) -> (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧ -b^{2, 52}_0)
c  in CNF:
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_2
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_1
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_0
c  in DIMACS:
 4799  4800 -4801  102 -4802 0
 4799  4800 -4801  102 -4803 0
 4799  4800 -4801  102 -4804 0

c  0-1 --> -1
c    (-b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧ -p_102) -> ( b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0)
c  in CNF:
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨  b^{2, 52}_2
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_1
c     b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨  b^{2, 52}_0
c  in DIMACS:
 4799  4800  4801  102  4802 0
 4799  4800  4801  102 -4803 0
 4799  4800  4801  102  4804 0

c  -1-1 --> -2
c    ( b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧  b^{2, 51}_0 ∧ -p_102) -> ( b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0)
c  in CNF:
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨  b^{2, 52}_2
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨  b^{2, 52}_1
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨  p_102 ∨ -b^{2, 52}_0
c  in DIMACS:
-4799  4800 -4801  102  4802 0
-4799  4800 -4801  102  4803 0
-4799  4800 -4801  102 -4804 0

c  -2-1 --> break 
c    ( b^{2, 51}_2 ∧  b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨  b^{2, 51}_0 ∨  p_102 ∨ break
c  in DIMACS:
-4799 -4800  4801  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 51}_2 ∧ -b^{2, 51}_1 ∧ -b^{2, 51}_0 ∧ true) 
c  in CNF:
c    -b^{2, 51}_2 ∨  b^{2, 51}_1 ∨  b^{2, 51}_0 ∨ false 
c  in DIMACS:
-4799  4800  4801  0

c  3 does not represent an automaton state.
c    -(-b^{2, 51}_2 ∧  b^{2, 51}_1 ∧  b^{2, 51}_0 ∧ true) 
c  in CNF:
c     b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ false 
c  in DIMACS:
 4799 -4800 -4801  0
c  -3 does not represent an automaton state.
c    -( b^{2, 51}_2 ∧  b^{2, 51}_1 ∧  b^{2, 51}_0 ∧ true) 
c  in CNF:
c    -b^{2, 51}_2 ∨ -b^{2, 51}_1 ∨ -b^{2, 51}_0 ∨ false 
c  in DIMACS:
-4799 -4800 -4801  0

c i = 52
c  -2+1 --> -1
c    ( b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧  p_104) -> ( b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0)
c  in CNF:
c    -b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨  b^{2, 53}_2
c    -b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_1
c    -b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨  b^{2, 53}_0
c  in DIMACS:
-4802 -4803  4804 -104  4805 0
-4802 -4803  4804 -104 -4806 0
-4802 -4803  4804 -104  4807 0

c  -1+1 --> 0
c    ( b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0 ∧  p_104) -> (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧ -b^{2, 53}_0)
c  in CNF:
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_2
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_1
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_0
c  in DIMACS:
-4802  4803 -4804 -104 -4805 0
-4802  4803 -4804 -104 -4806 0
-4802  4803 -4804 -104 -4807 0

c  0+1 --> 1
c    (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧  p_104) -> (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0)
c  in CNF:
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_2
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_1
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨  b^{2, 53}_0
c  in DIMACS:
 4802  4803  4804 -104 -4805 0
 4802  4803  4804 -104 -4806 0
 4802  4803  4804 -104  4807 0

c  1+1 --> 2
c    (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0 ∧  p_104) -> (-b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0)
c  in CNF:
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_2
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨  b^{2, 53}_1
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ -p_104 ∨ -b^{2, 53}_0
c  in DIMACS:
 4802  4803 -4804 -104 -4805 0
 4802  4803 -4804 -104  4806 0
 4802  4803 -4804 -104 -4807 0

c  2+1 --> break 
c    (-b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧  p_104) -> break
c  in CNF:
c     b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 4802 -4803  4804 -104 1162 0


c  2-1 --> 1
c    (-b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧ -p_104) -> (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0)
c  in CNF:
c     b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_2
c     b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_1
c     b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨  b^{2, 53}_0
c  in DIMACS:
 4802 -4803  4804  104 -4805 0
 4802 -4803  4804  104 -4806 0
 4802 -4803  4804  104  4807 0

c  1-1 --> 0
c    (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0 ∧ -p_104) -> (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧ -b^{2, 53}_0)
c  in CNF:
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_2
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_1
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_0
c  in DIMACS:
 4802  4803 -4804  104 -4805 0
 4802  4803 -4804  104 -4806 0
 4802  4803 -4804  104 -4807 0

c  0-1 --> -1
c    (-b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧ -p_104) -> ( b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0)
c  in CNF:
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨  b^{2, 53}_2
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_1
c     b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨  b^{2, 53}_0
c  in DIMACS:
 4802  4803  4804  104  4805 0
 4802  4803  4804  104 -4806 0
 4802  4803  4804  104  4807 0

c  -1-1 --> -2
c    ( b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧  b^{2, 52}_0 ∧ -p_104) -> ( b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0)
c  in CNF:
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨  b^{2, 53}_2
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨  b^{2, 53}_1
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨  p_104 ∨ -b^{2, 53}_0
c  in DIMACS:
-4802  4803 -4804  104  4805 0
-4802  4803 -4804  104  4806 0
-4802  4803 -4804  104 -4807 0

c  -2-1 --> break 
c    ( b^{2, 52}_2 ∧  b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨  b^{2, 52}_0 ∨  p_104 ∨ break
c  in DIMACS:
-4802 -4803  4804  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 52}_2 ∧ -b^{2, 52}_1 ∧ -b^{2, 52}_0 ∧ true) 
c  in CNF:
c    -b^{2, 52}_2 ∨  b^{2, 52}_1 ∨  b^{2, 52}_0 ∨ false 
c  in DIMACS:
-4802  4803  4804  0

c  3 does not represent an automaton state.
c    -(-b^{2, 52}_2 ∧  b^{2, 52}_1 ∧  b^{2, 52}_0 ∧ true) 
c  in CNF:
c     b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ false 
c  in DIMACS:
 4802 -4803 -4804  0
c  -3 does not represent an automaton state.
c    -( b^{2, 52}_2 ∧  b^{2, 52}_1 ∧  b^{2, 52}_0 ∧ true) 
c  in CNF:
c    -b^{2, 52}_2 ∨ -b^{2, 52}_1 ∨ -b^{2, 52}_0 ∨ false 
c  in DIMACS:
-4802 -4803 -4804  0

c i = 53
c  -2+1 --> -1
c    ( b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧  p_106) -> ( b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0)
c  in CNF:
c    -b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨  b^{2, 54}_2
c    -b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_1
c    -b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨  b^{2, 54}_0
c  in DIMACS:
-4805 -4806  4807 -106  4808 0
-4805 -4806  4807 -106 -4809 0
-4805 -4806  4807 -106  4810 0

c  -1+1 --> 0
c    ( b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0 ∧  p_106) -> (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧ -b^{2, 54}_0)
c  in CNF:
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_2
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_1
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_0
c  in DIMACS:
-4805  4806 -4807 -106 -4808 0
-4805  4806 -4807 -106 -4809 0
-4805  4806 -4807 -106 -4810 0

c  0+1 --> 1
c    (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧  p_106) -> (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0)
c  in CNF:
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_2
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_1
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨  b^{2, 54}_0
c  in DIMACS:
 4805  4806  4807 -106 -4808 0
 4805  4806  4807 -106 -4809 0
 4805  4806  4807 -106  4810 0

c  1+1 --> 2
c    (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0 ∧  p_106) -> (-b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0)
c  in CNF:
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_2
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨  b^{2, 54}_1
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ -p_106 ∨ -b^{2, 54}_0
c  in DIMACS:
 4805  4806 -4807 -106 -4808 0
 4805  4806 -4807 -106  4809 0
 4805  4806 -4807 -106 -4810 0

c  2+1 --> break 
c    (-b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧  p_106) -> break
c  in CNF:
c     b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ -p_106 ∨ break
c  in DIMACS:
 4805 -4806  4807 -106 1162 0


c  2-1 --> 1
c    (-b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧ -p_106) -> (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0)
c  in CNF:
c     b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_2
c     b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_1
c     b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨  b^{2, 54}_0
c  in DIMACS:
 4805 -4806  4807  106 -4808 0
 4805 -4806  4807  106 -4809 0
 4805 -4806  4807  106  4810 0

c  1-1 --> 0
c    (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0 ∧ -p_106) -> (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧ -b^{2, 54}_0)
c  in CNF:
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_2
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_1
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_0
c  in DIMACS:
 4805  4806 -4807  106 -4808 0
 4805  4806 -4807  106 -4809 0
 4805  4806 -4807  106 -4810 0

c  0-1 --> -1
c    (-b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧ -p_106) -> ( b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0)
c  in CNF:
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨  b^{2, 54}_2
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_1
c     b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨  b^{2, 54}_0
c  in DIMACS:
 4805  4806  4807  106  4808 0
 4805  4806  4807  106 -4809 0
 4805  4806  4807  106  4810 0

c  -1-1 --> -2
c    ( b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧  b^{2, 53}_0 ∧ -p_106) -> ( b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0)
c  in CNF:
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨  b^{2, 54}_2
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨  b^{2, 54}_1
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨  p_106 ∨ -b^{2, 54}_0
c  in DIMACS:
-4805  4806 -4807  106  4808 0
-4805  4806 -4807  106  4809 0
-4805  4806 -4807  106 -4810 0

c  -2-1 --> break 
c    ( b^{2, 53}_2 ∧  b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧ -p_106) -> break
c  in CNF:
c    -b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨  b^{2, 53}_0 ∨  p_106 ∨ break
c  in DIMACS:
-4805 -4806  4807  106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 53}_2 ∧ -b^{2, 53}_1 ∧ -b^{2, 53}_0 ∧ true) 
c  in CNF:
c    -b^{2, 53}_2 ∨  b^{2, 53}_1 ∨  b^{2, 53}_0 ∨ false 
c  in DIMACS:
-4805  4806  4807  0

c  3 does not represent an automaton state.
c    -(-b^{2, 53}_2 ∧  b^{2, 53}_1 ∧  b^{2, 53}_0 ∧ true) 
c  in CNF:
c     b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ false 
c  in DIMACS:
 4805 -4806 -4807  0
c  -3 does not represent an automaton state.
c    -( b^{2, 53}_2 ∧  b^{2, 53}_1 ∧  b^{2, 53}_0 ∧ true) 
c  in CNF:
c    -b^{2, 53}_2 ∨ -b^{2, 53}_1 ∨ -b^{2, 53}_0 ∨ false 
c  in DIMACS:
-4805 -4806 -4807  0

c i = 54
c  -2+1 --> -1
c    ( b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧  p_108) -> ( b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0)
c  in CNF:
c    -b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨  b^{2, 55}_2
c    -b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_1
c    -b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨  b^{2, 55}_0
c  in DIMACS:
-4808 -4809  4810 -108  4811 0
-4808 -4809  4810 -108 -4812 0
-4808 -4809  4810 -108  4813 0

c  -1+1 --> 0
c    ( b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0 ∧  p_108) -> (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧ -b^{2, 55}_0)
c  in CNF:
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_2
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_1
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_0
c  in DIMACS:
-4808  4809 -4810 -108 -4811 0
-4808  4809 -4810 -108 -4812 0
-4808  4809 -4810 -108 -4813 0

c  0+1 --> 1
c    (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧  p_108) -> (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0)
c  in CNF:
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_2
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_1
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨  b^{2, 55}_0
c  in DIMACS:
 4808  4809  4810 -108 -4811 0
 4808  4809  4810 -108 -4812 0
 4808  4809  4810 -108  4813 0

c  1+1 --> 2
c    (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0 ∧  p_108) -> (-b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0)
c  in CNF:
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_2
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨  b^{2, 55}_1
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ -p_108 ∨ -b^{2, 55}_0
c  in DIMACS:
 4808  4809 -4810 -108 -4811 0
 4808  4809 -4810 -108  4812 0
 4808  4809 -4810 -108 -4813 0

c  2+1 --> break 
c    (-b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧  p_108) -> break
c  in CNF:
c     b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 4808 -4809  4810 -108 1162 0


c  2-1 --> 1
c    (-b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧ -p_108) -> (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0)
c  in CNF:
c     b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_2
c     b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_1
c     b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨  b^{2, 55}_0
c  in DIMACS:
 4808 -4809  4810  108 -4811 0
 4808 -4809  4810  108 -4812 0
 4808 -4809  4810  108  4813 0

c  1-1 --> 0
c    (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0 ∧ -p_108) -> (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧ -b^{2, 55}_0)
c  in CNF:
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_2
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_1
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_0
c  in DIMACS:
 4808  4809 -4810  108 -4811 0
 4808  4809 -4810  108 -4812 0
 4808  4809 -4810  108 -4813 0

c  0-1 --> -1
c    (-b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧ -p_108) -> ( b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0)
c  in CNF:
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨  b^{2, 55}_2
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_1
c     b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨  b^{2, 55}_0
c  in DIMACS:
 4808  4809  4810  108  4811 0
 4808  4809  4810  108 -4812 0
 4808  4809  4810  108  4813 0

c  -1-1 --> -2
c    ( b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧  b^{2, 54}_0 ∧ -p_108) -> ( b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0)
c  in CNF:
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨  b^{2, 55}_2
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨  b^{2, 55}_1
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨  p_108 ∨ -b^{2, 55}_0
c  in DIMACS:
-4808  4809 -4810  108  4811 0
-4808  4809 -4810  108  4812 0
-4808  4809 -4810  108 -4813 0

c  -2-1 --> break 
c    ( b^{2, 54}_2 ∧  b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨  b^{2, 54}_0 ∨  p_108 ∨ break
c  in DIMACS:
-4808 -4809  4810  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 54}_2 ∧ -b^{2, 54}_1 ∧ -b^{2, 54}_0 ∧ true) 
c  in CNF:
c    -b^{2, 54}_2 ∨  b^{2, 54}_1 ∨  b^{2, 54}_0 ∨ false 
c  in DIMACS:
-4808  4809  4810  0

c  3 does not represent an automaton state.
c    -(-b^{2, 54}_2 ∧  b^{2, 54}_1 ∧  b^{2, 54}_0 ∧ true) 
c  in CNF:
c     b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ false 
c  in DIMACS:
 4808 -4809 -4810  0
c  -3 does not represent an automaton state.
c    -( b^{2, 54}_2 ∧  b^{2, 54}_1 ∧  b^{2, 54}_0 ∧ true) 
c  in CNF:
c    -b^{2, 54}_2 ∨ -b^{2, 54}_1 ∨ -b^{2, 54}_0 ∨ false 
c  in DIMACS:
-4808 -4809 -4810  0

c i = 55
c  -2+1 --> -1
c    ( b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧  p_110) -> ( b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0)
c  in CNF:
c    -b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨  b^{2, 56}_2
c    -b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_1
c    -b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨  b^{2, 56}_0
c  in DIMACS:
-4811 -4812  4813 -110  4814 0
-4811 -4812  4813 -110 -4815 0
-4811 -4812  4813 -110  4816 0

c  -1+1 --> 0
c    ( b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0 ∧  p_110) -> (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧ -b^{2, 56}_0)
c  in CNF:
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_2
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_1
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_0
c  in DIMACS:
-4811  4812 -4813 -110 -4814 0
-4811  4812 -4813 -110 -4815 0
-4811  4812 -4813 -110 -4816 0

c  0+1 --> 1
c    (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧  p_110) -> (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0)
c  in CNF:
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_2
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_1
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨  b^{2, 56}_0
c  in DIMACS:
 4811  4812  4813 -110 -4814 0
 4811  4812  4813 -110 -4815 0
 4811  4812  4813 -110  4816 0

c  1+1 --> 2
c    (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0 ∧  p_110) -> (-b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0)
c  in CNF:
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_2
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨  b^{2, 56}_1
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ -p_110 ∨ -b^{2, 56}_0
c  in DIMACS:
 4811  4812 -4813 -110 -4814 0
 4811  4812 -4813 -110  4815 0
 4811  4812 -4813 -110 -4816 0

c  2+1 --> break 
c    (-b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧  p_110) -> break
c  in CNF:
c     b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 4811 -4812  4813 -110 1162 0


c  2-1 --> 1
c    (-b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧ -p_110) -> (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0)
c  in CNF:
c     b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_2
c     b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_1
c     b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨  b^{2, 56}_0
c  in DIMACS:
 4811 -4812  4813  110 -4814 0
 4811 -4812  4813  110 -4815 0
 4811 -4812  4813  110  4816 0

c  1-1 --> 0
c    (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0 ∧ -p_110) -> (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧ -b^{2, 56}_0)
c  in CNF:
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_2
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_1
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_0
c  in DIMACS:
 4811  4812 -4813  110 -4814 0
 4811  4812 -4813  110 -4815 0
 4811  4812 -4813  110 -4816 0

c  0-1 --> -1
c    (-b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧ -p_110) -> ( b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0)
c  in CNF:
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨  b^{2, 56}_2
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_1
c     b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨  b^{2, 56}_0
c  in DIMACS:
 4811  4812  4813  110  4814 0
 4811  4812  4813  110 -4815 0
 4811  4812  4813  110  4816 0

c  -1-1 --> -2
c    ( b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧  b^{2, 55}_0 ∧ -p_110) -> ( b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0)
c  in CNF:
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨  b^{2, 56}_2
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨  b^{2, 56}_1
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨  p_110 ∨ -b^{2, 56}_0
c  in DIMACS:
-4811  4812 -4813  110  4814 0
-4811  4812 -4813  110  4815 0
-4811  4812 -4813  110 -4816 0

c  -2-1 --> break 
c    ( b^{2, 55}_2 ∧  b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨  b^{2, 55}_0 ∨  p_110 ∨ break
c  in DIMACS:
-4811 -4812  4813  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 55}_2 ∧ -b^{2, 55}_1 ∧ -b^{2, 55}_0 ∧ true) 
c  in CNF:
c    -b^{2, 55}_2 ∨  b^{2, 55}_1 ∨  b^{2, 55}_0 ∨ false 
c  in DIMACS:
-4811  4812  4813  0

c  3 does not represent an automaton state.
c    -(-b^{2, 55}_2 ∧  b^{2, 55}_1 ∧  b^{2, 55}_0 ∧ true) 
c  in CNF:
c     b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ false 
c  in DIMACS:
 4811 -4812 -4813  0
c  -3 does not represent an automaton state.
c    -( b^{2, 55}_2 ∧  b^{2, 55}_1 ∧  b^{2, 55}_0 ∧ true) 
c  in CNF:
c    -b^{2, 55}_2 ∨ -b^{2, 55}_1 ∨ -b^{2, 55}_0 ∨ false 
c  in DIMACS:
-4811 -4812 -4813  0

c i = 56
c  -2+1 --> -1
c    ( b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧  p_112) -> ( b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0)
c  in CNF:
c    -b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨  b^{2, 57}_2
c    -b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_1
c    -b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨  b^{2, 57}_0
c  in DIMACS:
-4814 -4815  4816 -112  4817 0
-4814 -4815  4816 -112 -4818 0
-4814 -4815  4816 -112  4819 0

c  -1+1 --> 0
c    ( b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0 ∧  p_112) -> (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧ -b^{2, 57}_0)
c  in CNF:
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_2
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_1
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_0
c  in DIMACS:
-4814  4815 -4816 -112 -4817 0
-4814  4815 -4816 -112 -4818 0
-4814  4815 -4816 -112 -4819 0

c  0+1 --> 1
c    (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧  p_112) -> (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0)
c  in CNF:
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_2
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_1
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨  b^{2, 57}_0
c  in DIMACS:
 4814  4815  4816 -112 -4817 0
 4814  4815  4816 -112 -4818 0
 4814  4815  4816 -112  4819 0

c  1+1 --> 2
c    (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0 ∧  p_112) -> (-b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0)
c  in CNF:
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_2
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨  b^{2, 57}_1
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ -p_112 ∨ -b^{2, 57}_0
c  in DIMACS:
 4814  4815 -4816 -112 -4817 0
 4814  4815 -4816 -112  4818 0
 4814  4815 -4816 -112 -4819 0

c  2+1 --> break 
c    (-b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧  p_112) -> break
c  in CNF:
c     b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 4814 -4815  4816 -112 1162 0


c  2-1 --> 1
c    (-b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧ -p_112) -> (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0)
c  in CNF:
c     b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_2
c     b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_1
c     b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨  b^{2, 57}_0
c  in DIMACS:
 4814 -4815  4816  112 -4817 0
 4814 -4815  4816  112 -4818 0
 4814 -4815  4816  112  4819 0

c  1-1 --> 0
c    (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0 ∧ -p_112) -> (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧ -b^{2, 57}_0)
c  in CNF:
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_2
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_1
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_0
c  in DIMACS:
 4814  4815 -4816  112 -4817 0
 4814  4815 -4816  112 -4818 0
 4814  4815 -4816  112 -4819 0

c  0-1 --> -1
c    (-b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧ -p_112) -> ( b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0)
c  in CNF:
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨  b^{2, 57}_2
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_1
c     b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨  b^{2, 57}_0
c  in DIMACS:
 4814  4815  4816  112  4817 0
 4814  4815  4816  112 -4818 0
 4814  4815  4816  112  4819 0

c  -1-1 --> -2
c    ( b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧  b^{2, 56}_0 ∧ -p_112) -> ( b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0)
c  in CNF:
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨  b^{2, 57}_2
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨  b^{2, 57}_1
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨  p_112 ∨ -b^{2, 57}_0
c  in DIMACS:
-4814  4815 -4816  112  4817 0
-4814  4815 -4816  112  4818 0
-4814  4815 -4816  112 -4819 0

c  -2-1 --> break 
c    ( b^{2, 56}_2 ∧  b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨  b^{2, 56}_0 ∨  p_112 ∨ break
c  in DIMACS:
-4814 -4815  4816  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 56}_2 ∧ -b^{2, 56}_1 ∧ -b^{2, 56}_0 ∧ true) 
c  in CNF:
c    -b^{2, 56}_2 ∨  b^{2, 56}_1 ∨  b^{2, 56}_0 ∨ false 
c  in DIMACS:
-4814  4815  4816  0

c  3 does not represent an automaton state.
c    -(-b^{2, 56}_2 ∧  b^{2, 56}_1 ∧  b^{2, 56}_0 ∧ true) 
c  in CNF:
c     b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ false 
c  in DIMACS:
 4814 -4815 -4816  0
c  -3 does not represent an automaton state.
c    -( b^{2, 56}_2 ∧  b^{2, 56}_1 ∧  b^{2, 56}_0 ∧ true) 
c  in CNF:
c    -b^{2, 56}_2 ∨ -b^{2, 56}_1 ∨ -b^{2, 56}_0 ∨ false 
c  in DIMACS:
-4814 -4815 -4816  0

c i = 57
c  -2+1 --> -1
c    ( b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧  p_114) -> ( b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0)
c  in CNF:
c    -b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨  b^{2, 58}_2
c    -b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_1
c    -b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨  b^{2, 58}_0
c  in DIMACS:
-4817 -4818  4819 -114  4820 0
-4817 -4818  4819 -114 -4821 0
-4817 -4818  4819 -114  4822 0

c  -1+1 --> 0
c    ( b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0 ∧  p_114) -> (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧ -b^{2, 58}_0)
c  in CNF:
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_2
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_1
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_0
c  in DIMACS:
-4817  4818 -4819 -114 -4820 0
-4817  4818 -4819 -114 -4821 0
-4817  4818 -4819 -114 -4822 0

c  0+1 --> 1
c    (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧  p_114) -> (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0)
c  in CNF:
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_2
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_1
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨  b^{2, 58}_0
c  in DIMACS:
 4817  4818  4819 -114 -4820 0
 4817  4818  4819 -114 -4821 0
 4817  4818  4819 -114  4822 0

c  1+1 --> 2
c    (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0 ∧  p_114) -> (-b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0)
c  in CNF:
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_2
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨  b^{2, 58}_1
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ -p_114 ∨ -b^{2, 58}_0
c  in DIMACS:
 4817  4818 -4819 -114 -4820 0
 4817  4818 -4819 -114  4821 0
 4817  4818 -4819 -114 -4822 0

c  2+1 --> break 
c    (-b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧  p_114) -> break
c  in CNF:
c     b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 4817 -4818  4819 -114 1162 0


c  2-1 --> 1
c    (-b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧ -p_114) -> (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0)
c  in CNF:
c     b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_2
c     b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_1
c     b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨  b^{2, 58}_0
c  in DIMACS:
 4817 -4818  4819  114 -4820 0
 4817 -4818  4819  114 -4821 0
 4817 -4818  4819  114  4822 0

c  1-1 --> 0
c    (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0 ∧ -p_114) -> (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧ -b^{2, 58}_0)
c  in CNF:
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_2
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_1
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_0
c  in DIMACS:
 4817  4818 -4819  114 -4820 0
 4817  4818 -4819  114 -4821 0
 4817  4818 -4819  114 -4822 0

c  0-1 --> -1
c    (-b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧ -p_114) -> ( b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0)
c  in CNF:
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨  b^{2, 58}_2
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_1
c     b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨  b^{2, 58}_0
c  in DIMACS:
 4817  4818  4819  114  4820 0
 4817  4818  4819  114 -4821 0
 4817  4818  4819  114  4822 0

c  -1-1 --> -2
c    ( b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧  b^{2, 57}_0 ∧ -p_114) -> ( b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0)
c  in CNF:
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨  b^{2, 58}_2
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨  b^{2, 58}_1
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨  p_114 ∨ -b^{2, 58}_0
c  in DIMACS:
-4817  4818 -4819  114  4820 0
-4817  4818 -4819  114  4821 0
-4817  4818 -4819  114 -4822 0

c  -2-1 --> break 
c    ( b^{2, 57}_2 ∧  b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨  b^{2, 57}_0 ∨  p_114 ∨ break
c  in DIMACS:
-4817 -4818  4819  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 57}_2 ∧ -b^{2, 57}_1 ∧ -b^{2, 57}_0 ∧ true) 
c  in CNF:
c    -b^{2, 57}_2 ∨  b^{2, 57}_1 ∨  b^{2, 57}_0 ∨ false 
c  in DIMACS:
-4817  4818  4819  0

c  3 does not represent an automaton state.
c    -(-b^{2, 57}_2 ∧  b^{2, 57}_1 ∧  b^{2, 57}_0 ∧ true) 
c  in CNF:
c     b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ false 
c  in DIMACS:
 4817 -4818 -4819  0
c  -3 does not represent an automaton state.
c    -( b^{2, 57}_2 ∧  b^{2, 57}_1 ∧  b^{2, 57}_0 ∧ true) 
c  in CNF:
c    -b^{2, 57}_2 ∨ -b^{2, 57}_1 ∨ -b^{2, 57}_0 ∨ false 
c  in DIMACS:
-4817 -4818 -4819  0

c i = 58
c  -2+1 --> -1
c    ( b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧  p_116) -> ( b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0)
c  in CNF:
c    -b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨  b^{2, 59}_2
c    -b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_1
c    -b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨  b^{2, 59}_0
c  in DIMACS:
-4820 -4821  4822 -116  4823 0
-4820 -4821  4822 -116 -4824 0
-4820 -4821  4822 -116  4825 0

c  -1+1 --> 0
c    ( b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0 ∧  p_116) -> (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧ -b^{2, 59}_0)
c  in CNF:
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_2
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_1
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_0
c  in DIMACS:
-4820  4821 -4822 -116 -4823 0
-4820  4821 -4822 -116 -4824 0
-4820  4821 -4822 -116 -4825 0

c  0+1 --> 1
c    (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧  p_116) -> (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0)
c  in CNF:
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_2
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_1
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨  b^{2, 59}_0
c  in DIMACS:
 4820  4821  4822 -116 -4823 0
 4820  4821  4822 -116 -4824 0
 4820  4821  4822 -116  4825 0

c  1+1 --> 2
c    (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0 ∧  p_116) -> (-b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0)
c  in CNF:
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_2
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨  b^{2, 59}_1
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ -p_116 ∨ -b^{2, 59}_0
c  in DIMACS:
 4820  4821 -4822 -116 -4823 0
 4820  4821 -4822 -116  4824 0
 4820  4821 -4822 -116 -4825 0

c  2+1 --> break 
c    (-b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧  p_116) -> break
c  in CNF:
c     b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 4820 -4821  4822 -116 1162 0


c  2-1 --> 1
c    (-b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧ -p_116) -> (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0)
c  in CNF:
c     b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_2
c     b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_1
c     b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨  b^{2, 59}_0
c  in DIMACS:
 4820 -4821  4822  116 -4823 0
 4820 -4821  4822  116 -4824 0
 4820 -4821  4822  116  4825 0

c  1-1 --> 0
c    (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0 ∧ -p_116) -> (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧ -b^{2, 59}_0)
c  in CNF:
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_2
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_1
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_0
c  in DIMACS:
 4820  4821 -4822  116 -4823 0
 4820  4821 -4822  116 -4824 0
 4820  4821 -4822  116 -4825 0

c  0-1 --> -1
c    (-b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧ -p_116) -> ( b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0)
c  in CNF:
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨  b^{2, 59}_2
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_1
c     b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨  b^{2, 59}_0
c  in DIMACS:
 4820  4821  4822  116  4823 0
 4820  4821  4822  116 -4824 0
 4820  4821  4822  116  4825 0

c  -1-1 --> -2
c    ( b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧  b^{2, 58}_0 ∧ -p_116) -> ( b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0)
c  in CNF:
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨  b^{2, 59}_2
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨  b^{2, 59}_1
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨  p_116 ∨ -b^{2, 59}_0
c  in DIMACS:
-4820  4821 -4822  116  4823 0
-4820  4821 -4822  116  4824 0
-4820  4821 -4822  116 -4825 0

c  -2-1 --> break 
c    ( b^{2, 58}_2 ∧  b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨  b^{2, 58}_0 ∨  p_116 ∨ break
c  in DIMACS:
-4820 -4821  4822  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 58}_2 ∧ -b^{2, 58}_1 ∧ -b^{2, 58}_0 ∧ true) 
c  in CNF:
c    -b^{2, 58}_2 ∨  b^{2, 58}_1 ∨  b^{2, 58}_0 ∨ false 
c  in DIMACS:
-4820  4821  4822  0

c  3 does not represent an automaton state.
c    -(-b^{2, 58}_2 ∧  b^{2, 58}_1 ∧  b^{2, 58}_0 ∧ true) 
c  in CNF:
c     b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ false 
c  in DIMACS:
 4820 -4821 -4822  0
c  -3 does not represent an automaton state.
c    -( b^{2, 58}_2 ∧  b^{2, 58}_1 ∧  b^{2, 58}_0 ∧ true) 
c  in CNF:
c    -b^{2, 58}_2 ∨ -b^{2, 58}_1 ∨ -b^{2, 58}_0 ∨ false 
c  in DIMACS:
-4820 -4821 -4822  0

c i = 59
c  -2+1 --> -1
c    ( b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧  p_118) -> ( b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0)
c  in CNF:
c    -b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨  b^{2, 60}_2
c    -b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_1
c    -b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨  b^{2, 60}_0
c  in DIMACS:
-4823 -4824  4825 -118  4826 0
-4823 -4824  4825 -118 -4827 0
-4823 -4824  4825 -118  4828 0

c  -1+1 --> 0
c    ( b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0 ∧  p_118) -> (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧ -b^{2, 60}_0)
c  in CNF:
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_2
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_1
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_0
c  in DIMACS:
-4823  4824 -4825 -118 -4826 0
-4823  4824 -4825 -118 -4827 0
-4823  4824 -4825 -118 -4828 0

c  0+1 --> 1
c    (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧  p_118) -> (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0)
c  in CNF:
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_2
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_1
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨  b^{2, 60}_0
c  in DIMACS:
 4823  4824  4825 -118 -4826 0
 4823  4824  4825 -118 -4827 0
 4823  4824  4825 -118  4828 0

c  1+1 --> 2
c    (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0 ∧  p_118) -> (-b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0)
c  in CNF:
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_2
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨  b^{2, 60}_1
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ -p_118 ∨ -b^{2, 60}_0
c  in DIMACS:
 4823  4824 -4825 -118 -4826 0
 4823  4824 -4825 -118  4827 0
 4823  4824 -4825 -118 -4828 0

c  2+1 --> break 
c    (-b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧  p_118) -> break
c  in CNF:
c     b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ -p_118 ∨ break
c  in DIMACS:
 4823 -4824  4825 -118 1162 0


c  2-1 --> 1
c    (-b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧ -p_118) -> (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0)
c  in CNF:
c     b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_2
c     b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_1
c     b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨  b^{2, 60}_0
c  in DIMACS:
 4823 -4824  4825  118 -4826 0
 4823 -4824  4825  118 -4827 0
 4823 -4824  4825  118  4828 0

c  1-1 --> 0
c    (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0 ∧ -p_118) -> (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧ -b^{2, 60}_0)
c  in CNF:
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_2
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_1
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_0
c  in DIMACS:
 4823  4824 -4825  118 -4826 0
 4823  4824 -4825  118 -4827 0
 4823  4824 -4825  118 -4828 0

c  0-1 --> -1
c    (-b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧ -p_118) -> ( b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0)
c  in CNF:
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨  b^{2, 60}_2
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_1
c     b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨  b^{2, 60}_0
c  in DIMACS:
 4823  4824  4825  118  4826 0
 4823  4824  4825  118 -4827 0
 4823  4824  4825  118  4828 0

c  -1-1 --> -2
c    ( b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧  b^{2, 59}_0 ∧ -p_118) -> ( b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0)
c  in CNF:
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨  b^{2, 60}_2
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨  b^{2, 60}_1
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨  p_118 ∨ -b^{2, 60}_0
c  in DIMACS:
-4823  4824 -4825  118  4826 0
-4823  4824 -4825  118  4827 0
-4823  4824 -4825  118 -4828 0

c  -2-1 --> break 
c    ( b^{2, 59}_2 ∧  b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧ -p_118) -> break
c  in CNF:
c    -b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨  b^{2, 59}_0 ∨  p_118 ∨ break
c  in DIMACS:
-4823 -4824  4825  118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 59}_2 ∧ -b^{2, 59}_1 ∧ -b^{2, 59}_0 ∧ true) 
c  in CNF:
c    -b^{2, 59}_2 ∨  b^{2, 59}_1 ∨  b^{2, 59}_0 ∨ false 
c  in DIMACS:
-4823  4824  4825  0

c  3 does not represent an automaton state.
c    -(-b^{2, 59}_2 ∧  b^{2, 59}_1 ∧  b^{2, 59}_0 ∧ true) 
c  in CNF:
c     b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ false 
c  in DIMACS:
 4823 -4824 -4825  0
c  -3 does not represent an automaton state.
c    -( b^{2, 59}_2 ∧  b^{2, 59}_1 ∧  b^{2, 59}_0 ∧ true) 
c  in CNF:
c    -b^{2, 59}_2 ∨ -b^{2, 59}_1 ∨ -b^{2, 59}_0 ∨ false 
c  in DIMACS:
-4823 -4824 -4825  0

c i = 60
c  -2+1 --> -1
c    ( b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧  p_120) -> ( b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0)
c  in CNF:
c    -b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨  b^{2, 61}_2
c    -b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_1
c    -b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨  b^{2, 61}_0
c  in DIMACS:
-4826 -4827  4828 -120  4829 0
-4826 -4827  4828 -120 -4830 0
-4826 -4827  4828 -120  4831 0

c  -1+1 --> 0
c    ( b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0 ∧  p_120) -> (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧ -b^{2, 61}_0)
c  in CNF:
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_2
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_1
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_0
c  in DIMACS:
-4826  4827 -4828 -120 -4829 0
-4826  4827 -4828 -120 -4830 0
-4826  4827 -4828 -120 -4831 0

c  0+1 --> 1
c    (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧  p_120) -> (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0)
c  in CNF:
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_2
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_1
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨  b^{2, 61}_0
c  in DIMACS:
 4826  4827  4828 -120 -4829 0
 4826  4827  4828 -120 -4830 0
 4826  4827  4828 -120  4831 0

c  1+1 --> 2
c    (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0 ∧  p_120) -> (-b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0)
c  in CNF:
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_2
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨  b^{2, 61}_1
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ -p_120 ∨ -b^{2, 61}_0
c  in DIMACS:
 4826  4827 -4828 -120 -4829 0
 4826  4827 -4828 -120  4830 0
 4826  4827 -4828 -120 -4831 0

c  2+1 --> break 
c    (-b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧  p_120) -> break
c  in CNF:
c     b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 4826 -4827  4828 -120 1162 0


c  2-1 --> 1
c    (-b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧ -p_120) -> (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0)
c  in CNF:
c     b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_2
c     b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_1
c     b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨  b^{2, 61}_0
c  in DIMACS:
 4826 -4827  4828  120 -4829 0
 4826 -4827  4828  120 -4830 0
 4826 -4827  4828  120  4831 0

c  1-1 --> 0
c    (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0 ∧ -p_120) -> (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧ -b^{2, 61}_0)
c  in CNF:
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_2
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_1
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_0
c  in DIMACS:
 4826  4827 -4828  120 -4829 0
 4826  4827 -4828  120 -4830 0
 4826  4827 -4828  120 -4831 0

c  0-1 --> -1
c    (-b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧ -p_120) -> ( b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0)
c  in CNF:
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨  b^{2, 61}_2
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_1
c     b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨  b^{2, 61}_0
c  in DIMACS:
 4826  4827  4828  120  4829 0
 4826  4827  4828  120 -4830 0
 4826  4827  4828  120  4831 0

c  -1-1 --> -2
c    ( b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧  b^{2, 60}_0 ∧ -p_120) -> ( b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0)
c  in CNF:
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨  b^{2, 61}_2
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨  b^{2, 61}_1
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨  p_120 ∨ -b^{2, 61}_0
c  in DIMACS:
-4826  4827 -4828  120  4829 0
-4826  4827 -4828  120  4830 0
-4826  4827 -4828  120 -4831 0

c  -2-1 --> break 
c    ( b^{2, 60}_2 ∧  b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨  b^{2, 60}_0 ∨  p_120 ∨ break
c  in DIMACS:
-4826 -4827  4828  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 60}_2 ∧ -b^{2, 60}_1 ∧ -b^{2, 60}_0 ∧ true) 
c  in CNF:
c    -b^{2, 60}_2 ∨  b^{2, 60}_1 ∨  b^{2, 60}_0 ∨ false 
c  in DIMACS:
-4826  4827  4828  0

c  3 does not represent an automaton state.
c    -(-b^{2, 60}_2 ∧  b^{2, 60}_1 ∧  b^{2, 60}_0 ∧ true) 
c  in CNF:
c     b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ false 
c  in DIMACS:
 4826 -4827 -4828  0
c  -3 does not represent an automaton state.
c    -( b^{2, 60}_2 ∧  b^{2, 60}_1 ∧  b^{2, 60}_0 ∧ true) 
c  in CNF:
c    -b^{2, 60}_2 ∨ -b^{2, 60}_1 ∨ -b^{2, 60}_0 ∨ false 
c  in DIMACS:
-4826 -4827 -4828  0

c i = 61
c  -2+1 --> -1
c    ( b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧  p_122) -> ( b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0)
c  in CNF:
c    -b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨  b^{2, 62}_2
c    -b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_1
c    -b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨  b^{2, 62}_0
c  in DIMACS:
-4829 -4830  4831 -122  4832 0
-4829 -4830  4831 -122 -4833 0
-4829 -4830  4831 -122  4834 0

c  -1+1 --> 0
c    ( b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0 ∧  p_122) -> (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧ -b^{2, 62}_0)
c  in CNF:
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_2
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_1
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_0
c  in DIMACS:
-4829  4830 -4831 -122 -4832 0
-4829  4830 -4831 -122 -4833 0
-4829  4830 -4831 -122 -4834 0

c  0+1 --> 1
c    (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧  p_122) -> (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0)
c  in CNF:
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_2
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_1
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨  b^{2, 62}_0
c  in DIMACS:
 4829  4830  4831 -122 -4832 0
 4829  4830  4831 -122 -4833 0
 4829  4830  4831 -122  4834 0

c  1+1 --> 2
c    (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0 ∧  p_122) -> (-b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0)
c  in CNF:
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_2
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨  b^{2, 62}_1
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ -p_122 ∨ -b^{2, 62}_0
c  in DIMACS:
 4829  4830 -4831 -122 -4832 0
 4829  4830 -4831 -122  4833 0
 4829  4830 -4831 -122 -4834 0

c  2+1 --> break 
c    (-b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧  p_122) -> break
c  in CNF:
c     b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ -p_122 ∨ break
c  in DIMACS:
 4829 -4830  4831 -122 1162 0


c  2-1 --> 1
c    (-b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧ -p_122) -> (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0)
c  in CNF:
c     b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_2
c     b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_1
c     b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨  b^{2, 62}_0
c  in DIMACS:
 4829 -4830  4831  122 -4832 0
 4829 -4830  4831  122 -4833 0
 4829 -4830  4831  122  4834 0

c  1-1 --> 0
c    (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0 ∧ -p_122) -> (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧ -b^{2, 62}_0)
c  in CNF:
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_2
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_1
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_0
c  in DIMACS:
 4829  4830 -4831  122 -4832 0
 4829  4830 -4831  122 -4833 0
 4829  4830 -4831  122 -4834 0

c  0-1 --> -1
c    (-b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧ -p_122) -> ( b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0)
c  in CNF:
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨  b^{2, 62}_2
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_1
c     b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨  b^{2, 62}_0
c  in DIMACS:
 4829  4830  4831  122  4832 0
 4829  4830  4831  122 -4833 0
 4829  4830  4831  122  4834 0

c  -1-1 --> -2
c    ( b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧  b^{2, 61}_0 ∧ -p_122) -> ( b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0)
c  in CNF:
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨  b^{2, 62}_2
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨  b^{2, 62}_1
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨  p_122 ∨ -b^{2, 62}_0
c  in DIMACS:
-4829  4830 -4831  122  4832 0
-4829  4830 -4831  122  4833 0
-4829  4830 -4831  122 -4834 0

c  -2-1 --> break 
c    ( b^{2, 61}_2 ∧  b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧ -p_122) -> break
c  in CNF:
c    -b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨  b^{2, 61}_0 ∨  p_122 ∨ break
c  in DIMACS:
-4829 -4830  4831  122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 61}_2 ∧ -b^{2, 61}_1 ∧ -b^{2, 61}_0 ∧ true) 
c  in CNF:
c    -b^{2, 61}_2 ∨  b^{2, 61}_1 ∨  b^{2, 61}_0 ∨ false 
c  in DIMACS:
-4829  4830  4831  0

c  3 does not represent an automaton state.
c    -(-b^{2, 61}_2 ∧  b^{2, 61}_1 ∧  b^{2, 61}_0 ∧ true) 
c  in CNF:
c     b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ false 
c  in DIMACS:
 4829 -4830 -4831  0
c  -3 does not represent an automaton state.
c    -( b^{2, 61}_2 ∧  b^{2, 61}_1 ∧  b^{2, 61}_0 ∧ true) 
c  in CNF:
c    -b^{2, 61}_2 ∨ -b^{2, 61}_1 ∨ -b^{2, 61}_0 ∨ false 
c  in DIMACS:
-4829 -4830 -4831  0

c i = 62
c  -2+1 --> -1
c    ( b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧  p_124) -> ( b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0)
c  in CNF:
c    -b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨  b^{2, 63}_2
c    -b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_1
c    -b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨  b^{2, 63}_0
c  in DIMACS:
-4832 -4833  4834 -124  4835 0
-4832 -4833  4834 -124 -4836 0
-4832 -4833  4834 -124  4837 0

c  -1+1 --> 0
c    ( b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0 ∧  p_124) -> (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧ -b^{2, 63}_0)
c  in CNF:
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_2
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_1
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_0
c  in DIMACS:
-4832  4833 -4834 -124 -4835 0
-4832  4833 -4834 -124 -4836 0
-4832  4833 -4834 -124 -4837 0

c  0+1 --> 1
c    (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧  p_124) -> (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0)
c  in CNF:
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_2
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_1
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨  b^{2, 63}_0
c  in DIMACS:
 4832  4833  4834 -124 -4835 0
 4832  4833  4834 -124 -4836 0
 4832  4833  4834 -124  4837 0

c  1+1 --> 2
c    (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0 ∧  p_124) -> (-b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0)
c  in CNF:
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_2
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨  b^{2, 63}_1
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ -p_124 ∨ -b^{2, 63}_0
c  in DIMACS:
 4832  4833 -4834 -124 -4835 0
 4832  4833 -4834 -124  4836 0
 4832  4833 -4834 -124 -4837 0

c  2+1 --> break 
c    (-b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧  p_124) -> break
c  in CNF:
c     b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 4832 -4833  4834 -124 1162 0


c  2-1 --> 1
c    (-b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧ -p_124) -> (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0)
c  in CNF:
c     b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_2
c     b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_1
c     b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨  b^{2, 63}_0
c  in DIMACS:
 4832 -4833  4834  124 -4835 0
 4832 -4833  4834  124 -4836 0
 4832 -4833  4834  124  4837 0

c  1-1 --> 0
c    (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0 ∧ -p_124) -> (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧ -b^{2, 63}_0)
c  in CNF:
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_2
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_1
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_0
c  in DIMACS:
 4832  4833 -4834  124 -4835 0
 4832  4833 -4834  124 -4836 0
 4832  4833 -4834  124 -4837 0

c  0-1 --> -1
c    (-b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧ -p_124) -> ( b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0)
c  in CNF:
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨  b^{2, 63}_2
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_1
c     b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨  b^{2, 63}_0
c  in DIMACS:
 4832  4833  4834  124  4835 0
 4832  4833  4834  124 -4836 0
 4832  4833  4834  124  4837 0

c  -1-1 --> -2
c    ( b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧  b^{2, 62}_0 ∧ -p_124) -> ( b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0)
c  in CNF:
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨  b^{2, 63}_2
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨  b^{2, 63}_1
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨  p_124 ∨ -b^{2, 63}_0
c  in DIMACS:
-4832  4833 -4834  124  4835 0
-4832  4833 -4834  124  4836 0
-4832  4833 -4834  124 -4837 0

c  -2-1 --> break 
c    ( b^{2, 62}_2 ∧  b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨  b^{2, 62}_0 ∨  p_124 ∨ break
c  in DIMACS:
-4832 -4833  4834  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 62}_2 ∧ -b^{2, 62}_1 ∧ -b^{2, 62}_0 ∧ true) 
c  in CNF:
c    -b^{2, 62}_2 ∨  b^{2, 62}_1 ∨  b^{2, 62}_0 ∨ false 
c  in DIMACS:
-4832  4833  4834  0

c  3 does not represent an automaton state.
c    -(-b^{2, 62}_2 ∧  b^{2, 62}_1 ∧  b^{2, 62}_0 ∧ true) 
c  in CNF:
c     b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ false 
c  in DIMACS:
 4832 -4833 -4834  0
c  -3 does not represent an automaton state.
c    -( b^{2, 62}_2 ∧  b^{2, 62}_1 ∧  b^{2, 62}_0 ∧ true) 
c  in CNF:
c    -b^{2, 62}_2 ∨ -b^{2, 62}_1 ∨ -b^{2, 62}_0 ∨ false 
c  in DIMACS:
-4832 -4833 -4834  0

c i = 63
c  -2+1 --> -1
c    ( b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧  p_126) -> ( b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0)
c  in CNF:
c    -b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨  b^{2, 64}_2
c    -b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_1
c    -b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨  b^{2, 64}_0
c  in DIMACS:
-4835 -4836  4837 -126  4838 0
-4835 -4836  4837 -126 -4839 0
-4835 -4836  4837 -126  4840 0

c  -1+1 --> 0
c    ( b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0 ∧  p_126) -> (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧ -b^{2, 64}_0)
c  in CNF:
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_2
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_1
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_0
c  in DIMACS:
-4835  4836 -4837 -126 -4838 0
-4835  4836 -4837 -126 -4839 0
-4835  4836 -4837 -126 -4840 0

c  0+1 --> 1
c    (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧  p_126) -> (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0)
c  in CNF:
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_2
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_1
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨  b^{2, 64}_0
c  in DIMACS:
 4835  4836  4837 -126 -4838 0
 4835  4836  4837 -126 -4839 0
 4835  4836  4837 -126  4840 0

c  1+1 --> 2
c    (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0 ∧  p_126) -> (-b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0)
c  in CNF:
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_2
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨  b^{2, 64}_1
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ -p_126 ∨ -b^{2, 64}_0
c  in DIMACS:
 4835  4836 -4837 -126 -4838 0
 4835  4836 -4837 -126  4839 0
 4835  4836 -4837 -126 -4840 0

c  2+1 --> break 
c    (-b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧  p_126) -> break
c  in CNF:
c     b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 4835 -4836  4837 -126 1162 0


c  2-1 --> 1
c    (-b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧ -p_126) -> (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0)
c  in CNF:
c     b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_2
c     b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_1
c     b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨  b^{2, 64}_0
c  in DIMACS:
 4835 -4836  4837  126 -4838 0
 4835 -4836  4837  126 -4839 0
 4835 -4836  4837  126  4840 0

c  1-1 --> 0
c    (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0 ∧ -p_126) -> (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧ -b^{2, 64}_0)
c  in CNF:
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_2
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_1
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_0
c  in DIMACS:
 4835  4836 -4837  126 -4838 0
 4835  4836 -4837  126 -4839 0
 4835  4836 -4837  126 -4840 0

c  0-1 --> -1
c    (-b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧ -p_126) -> ( b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0)
c  in CNF:
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨  b^{2, 64}_2
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_1
c     b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨  b^{2, 64}_0
c  in DIMACS:
 4835  4836  4837  126  4838 0
 4835  4836  4837  126 -4839 0
 4835  4836  4837  126  4840 0

c  -1-1 --> -2
c    ( b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧  b^{2, 63}_0 ∧ -p_126) -> ( b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0)
c  in CNF:
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨  b^{2, 64}_2
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨  b^{2, 64}_1
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨  p_126 ∨ -b^{2, 64}_0
c  in DIMACS:
-4835  4836 -4837  126  4838 0
-4835  4836 -4837  126  4839 0
-4835  4836 -4837  126 -4840 0

c  -2-1 --> break 
c    ( b^{2, 63}_2 ∧  b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨  b^{2, 63}_0 ∨  p_126 ∨ break
c  in DIMACS:
-4835 -4836  4837  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 63}_2 ∧ -b^{2, 63}_1 ∧ -b^{2, 63}_0 ∧ true) 
c  in CNF:
c    -b^{2, 63}_2 ∨  b^{2, 63}_1 ∨  b^{2, 63}_0 ∨ false 
c  in DIMACS:
-4835  4836  4837  0

c  3 does not represent an automaton state.
c    -(-b^{2, 63}_2 ∧  b^{2, 63}_1 ∧  b^{2, 63}_0 ∧ true) 
c  in CNF:
c     b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ false 
c  in DIMACS:
 4835 -4836 -4837  0
c  -3 does not represent an automaton state.
c    -( b^{2, 63}_2 ∧  b^{2, 63}_1 ∧  b^{2, 63}_0 ∧ true) 
c  in CNF:
c    -b^{2, 63}_2 ∨ -b^{2, 63}_1 ∨ -b^{2, 63}_0 ∨ false 
c  in DIMACS:
-4835 -4836 -4837  0

c i = 64
c  -2+1 --> -1
c    ( b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧  p_128) -> ( b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0)
c  in CNF:
c    -b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨  b^{2, 65}_2
c    -b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_1
c    -b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨  b^{2, 65}_0
c  in DIMACS:
-4838 -4839  4840 -128  4841 0
-4838 -4839  4840 -128 -4842 0
-4838 -4839  4840 -128  4843 0

c  -1+1 --> 0
c    ( b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0 ∧  p_128) -> (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧ -b^{2, 65}_0)
c  in CNF:
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_2
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_1
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_0
c  in DIMACS:
-4838  4839 -4840 -128 -4841 0
-4838  4839 -4840 -128 -4842 0
-4838  4839 -4840 -128 -4843 0

c  0+1 --> 1
c    (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧  p_128) -> (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0)
c  in CNF:
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_2
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_1
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨  b^{2, 65}_0
c  in DIMACS:
 4838  4839  4840 -128 -4841 0
 4838  4839  4840 -128 -4842 0
 4838  4839  4840 -128  4843 0

c  1+1 --> 2
c    (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0 ∧  p_128) -> (-b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0)
c  in CNF:
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_2
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨  b^{2, 65}_1
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ -p_128 ∨ -b^{2, 65}_0
c  in DIMACS:
 4838  4839 -4840 -128 -4841 0
 4838  4839 -4840 -128  4842 0
 4838  4839 -4840 -128 -4843 0

c  2+1 --> break 
c    (-b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧  p_128) -> break
c  in CNF:
c     b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 4838 -4839  4840 -128 1162 0


c  2-1 --> 1
c    (-b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧ -p_128) -> (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0)
c  in CNF:
c     b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_2
c     b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_1
c     b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨  b^{2, 65}_0
c  in DIMACS:
 4838 -4839  4840  128 -4841 0
 4838 -4839  4840  128 -4842 0
 4838 -4839  4840  128  4843 0

c  1-1 --> 0
c    (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0 ∧ -p_128) -> (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧ -b^{2, 65}_0)
c  in CNF:
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_2
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_1
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_0
c  in DIMACS:
 4838  4839 -4840  128 -4841 0
 4838  4839 -4840  128 -4842 0
 4838  4839 -4840  128 -4843 0

c  0-1 --> -1
c    (-b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧ -p_128) -> ( b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0)
c  in CNF:
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨  b^{2, 65}_2
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_1
c     b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨  b^{2, 65}_0
c  in DIMACS:
 4838  4839  4840  128  4841 0
 4838  4839  4840  128 -4842 0
 4838  4839  4840  128  4843 0

c  -1-1 --> -2
c    ( b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧  b^{2, 64}_0 ∧ -p_128) -> ( b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0)
c  in CNF:
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨  b^{2, 65}_2
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨  b^{2, 65}_1
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨  p_128 ∨ -b^{2, 65}_0
c  in DIMACS:
-4838  4839 -4840  128  4841 0
-4838  4839 -4840  128  4842 0
-4838  4839 -4840  128 -4843 0

c  -2-1 --> break 
c    ( b^{2, 64}_2 ∧  b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨  b^{2, 64}_0 ∨  p_128 ∨ break
c  in DIMACS:
-4838 -4839  4840  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 64}_2 ∧ -b^{2, 64}_1 ∧ -b^{2, 64}_0 ∧ true) 
c  in CNF:
c    -b^{2, 64}_2 ∨  b^{2, 64}_1 ∨  b^{2, 64}_0 ∨ false 
c  in DIMACS:
-4838  4839  4840  0

c  3 does not represent an automaton state.
c    -(-b^{2, 64}_2 ∧  b^{2, 64}_1 ∧  b^{2, 64}_0 ∧ true) 
c  in CNF:
c     b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ false 
c  in DIMACS:
 4838 -4839 -4840  0
c  -3 does not represent an automaton state.
c    -( b^{2, 64}_2 ∧  b^{2, 64}_1 ∧  b^{2, 64}_0 ∧ true) 
c  in CNF:
c    -b^{2, 64}_2 ∨ -b^{2, 64}_1 ∨ -b^{2, 64}_0 ∨ false 
c  in DIMACS:
-4838 -4839 -4840  0

c i = 65
c  -2+1 --> -1
c    ( b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧  p_130) -> ( b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0)
c  in CNF:
c    -b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨  b^{2, 66}_2
c    -b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_1
c    -b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨  b^{2, 66}_0
c  in DIMACS:
-4841 -4842  4843 -130  4844 0
-4841 -4842  4843 -130 -4845 0
-4841 -4842  4843 -130  4846 0

c  -1+1 --> 0
c    ( b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0 ∧  p_130) -> (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧ -b^{2, 66}_0)
c  in CNF:
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_2
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_1
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_0
c  in DIMACS:
-4841  4842 -4843 -130 -4844 0
-4841  4842 -4843 -130 -4845 0
-4841  4842 -4843 -130 -4846 0

c  0+1 --> 1
c    (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧  p_130) -> (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0)
c  in CNF:
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_2
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_1
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨  b^{2, 66}_0
c  in DIMACS:
 4841  4842  4843 -130 -4844 0
 4841  4842  4843 -130 -4845 0
 4841  4842  4843 -130  4846 0

c  1+1 --> 2
c    (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0 ∧  p_130) -> (-b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0)
c  in CNF:
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_2
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨  b^{2, 66}_1
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ -p_130 ∨ -b^{2, 66}_0
c  in DIMACS:
 4841  4842 -4843 -130 -4844 0
 4841  4842 -4843 -130  4845 0
 4841  4842 -4843 -130 -4846 0

c  2+1 --> break 
c    (-b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧  p_130) -> break
c  in CNF:
c     b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 4841 -4842  4843 -130 1162 0


c  2-1 --> 1
c    (-b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧ -p_130) -> (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0)
c  in CNF:
c     b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_2
c     b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_1
c     b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨  b^{2, 66}_0
c  in DIMACS:
 4841 -4842  4843  130 -4844 0
 4841 -4842  4843  130 -4845 0
 4841 -4842  4843  130  4846 0

c  1-1 --> 0
c    (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0 ∧ -p_130) -> (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧ -b^{2, 66}_0)
c  in CNF:
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_2
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_1
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_0
c  in DIMACS:
 4841  4842 -4843  130 -4844 0
 4841  4842 -4843  130 -4845 0
 4841  4842 -4843  130 -4846 0

c  0-1 --> -1
c    (-b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧ -p_130) -> ( b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0)
c  in CNF:
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨  b^{2, 66}_2
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_1
c     b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨  b^{2, 66}_0
c  in DIMACS:
 4841  4842  4843  130  4844 0
 4841  4842  4843  130 -4845 0
 4841  4842  4843  130  4846 0

c  -1-1 --> -2
c    ( b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧  b^{2, 65}_0 ∧ -p_130) -> ( b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0)
c  in CNF:
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨  b^{2, 66}_2
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨  b^{2, 66}_1
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨  p_130 ∨ -b^{2, 66}_0
c  in DIMACS:
-4841  4842 -4843  130  4844 0
-4841  4842 -4843  130  4845 0
-4841  4842 -4843  130 -4846 0

c  -2-1 --> break 
c    ( b^{2, 65}_2 ∧  b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨  b^{2, 65}_0 ∨  p_130 ∨ break
c  in DIMACS:
-4841 -4842  4843  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 65}_2 ∧ -b^{2, 65}_1 ∧ -b^{2, 65}_0 ∧ true) 
c  in CNF:
c    -b^{2, 65}_2 ∨  b^{2, 65}_1 ∨  b^{2, 65}_0 ∨ false 
c  in DIMACS:
-4841  4842  4843  0

c  3 does not represent an automaton state.
c    -(-b^{2, 65}_2 ∧  b^{2, 65}_1 ∧  b^{2, 65}_0 ∧ true) 
c  in CNF:
c     b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ false 
c  in DIMACS:
 4841 -4842 -4843  0
c  -3 does not represent an automaton state.
c    -( b^{2, 65}_2 ∧  b^{2, 65}_1 ∧  b^{2, 65}_0 ∧ true) 
c  in CNF:
c    -b^{2, 65}_2 ∨ -b^{2, 65}_1 ∨ -b^{2, 65}_0 ∨ false 
c  in DIMACS:
-4841 -4842 -4843  0

c i = 66
c  -2+1 --> -1
c    ( b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧  p_132) -> ( b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0)
c  in CNF:
c    -b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨  b^{2, 67}_2
c    -b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_1
c    -b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨  b^{2, 67}_0
c  in DIMACS:
-4844 -4845  4846 -132  4847 0
-4844 -4845  4846 -132 -4848 0
-4844 -4845  4846 -132  4849 0

c  -1+1 --> 0
c    ( b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0 ∧  p_132) -> (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧ -b^{2, 67}_0)
c  in CNF:
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_2
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_1
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_0
c  in DIMACS:
-4844  4845 -4846 -132 -4847 0
-4844  4845 -4846 -132 -4848 0
-4844  4845 -4846 -132 -4849 0

c  0+1 --> 1
c    (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧  p_132) -> (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0)
c  in CNF:
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_2
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_1
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨  b^{2, 67}_0
c  in DIMACS:
 4844  4845  4846 -132 -4847 0
 4844  4845  4846 -132 -4848 0
 4844  4845  4846 -132  4849 0

c  1+1 --> 2
c    (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0 ∧  p_132) -> (-b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0)
c  in CNF:
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_2
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨  b^{2, 67}_1
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ -p_132 ∨ -b^{2, 67}_0
c  in DIMACS:
 4844  4845 -4846 -132 -4847 0
 4844  4845 -4846 -132  4848 0
 4844  4845 -4846 -132 -4849 0

c  2+1 --> break 
c    (-b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧  p_132) -> break
c  in CNF:
c     b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 4844 -4845  4846 -132 1162 0


c  2-1 --> 1
c    (-b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧ -p_132) -> (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0)
c  in CNF:
c     b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_2
c     b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_1
c     b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨  b^{2, 67}_0
c  in DIMACS:
 4844 -4845  4846  132 -4847 0
 4844 -4845  4846  132 -4848 0
 4844 -4845  4846  132  4849 0

c  1-1 --> 0
c    (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0 ∧ -p_132) -> (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧ -b^{2, 67}_0)
c  in CNF:
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_2
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_1
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_0
c  in DIMACS:
 4844  4845 -4846  132 -4847 0
 4844  4845 -4846  132 -4848 0
 4844  4845 -4846  132 -4849 0

c  0-1 --> -1
c    (-b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧ -p_132) -> ( b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0)
c  in CNF:
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨  b^{2, 67}_2
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_1
c     b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨  b^{2, 67}_0
c  in DIMACS:
 4844  4845  4846  132  4847 0
 4844  4845  4846  132 -4848 0
 4844  4845  4846  132  4849 0

c  -1-1 --> -2
c    ( b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧  b^{2, 66}_0 ∧ -p_132) -> ( b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0)
c  in CNF:
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨  b^{2, 67}_2
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨  b^{2, 67}_1
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨  p_132 ∨ -b^{2, 67}_0
c  in DIMACS:
-4844  4845 -4846  132  4847 0
-4844  4845 -4846  132  4848 0
-4844  4845 -4846  132 -4849 0

c  -2-1 --> break 
c    ( b^{2, 66}_2 ∧  b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨  b^{2, 66}_0 ∨  p_132 ∨ break
c  in DIMACS:
-4844 -4845  4846  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 66}_2 ∧ -b^{2, 66}_1 ∧ -b^{2, 66}_0 ∧ true) 
c  in CNF:
c    -b^{2, 66}_2 ∨  b^{2, 66}_1 ∨  b^{2, 66}_0 ∨ false 
c  in DIMACS:
-4844  4845  4846  0

c  3 does not represent an automaton state.
c    -(-b^{2, 66}_2 ∧  b^{2, 66}_1 ∧  b^{2, 66}_0 ∧ true) 
c  in CNF:
c     b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ false 
c  in DIMACS:
 4844 -4845 -4846  0
c  -3 does not represent an automaton state.
c    -( b^{2, 66}_2 ∧  b^{2, 66}_1 ∧  b^{2, 66}_0 ∧ true) 
c  in CNF:
c    -b^{2, 66}_2 ∨ -b^{2, 66}_1 ∨ -b^{2, 66}_0 ∨ false 
c  in DIMACS:
-4844 -4845 -4846  0

c i = 67
c  -2+1 --> -1
c    ( b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧  p_134) -> ( b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0)
c  in CNF:
c    -b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨  b^{2, 68}_2
c    -b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_1
c    -b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨  b^{2, 68}_0
c  in DIMACS:
-4847 -4848  4849 -134  4850 0
-4847 -4848  4849 -134 -4851 0
-4847 -4848  4849 -134  4852 0

c  -1+1 --> 0
c    ( b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0 ∧  p_134) -> (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧ -b^{2, 68}_0)
c  in CNF:
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_2
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_1
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_0
c  in DIMACS:
-4847  4848 -4849 -134 -4850 0
-4847  4848 -4849 -134 -4851 0
-4847  4848 -4849 -134 -4852 0

c  0+1 --> 1
c    (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧  p_134) -> (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0)
c  in CNF:
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_2
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_1
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨  b^{2, 68}_0
c  in DIMACS:
 4847  4848  4849 -134 -4850 0
 4847  4848  4849 -134 -4851 0
 4847  4848  4849 -134  4852 0

c  1+1 --> 2
c    (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0 ∧  p_134) -> (-b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0)
c  in CNF:
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_2
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨  b^{2, 68}_1
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ -p_134 ∨ -b^{2, 68}_0
c  in DIMACS:
 4847  4848 -4849 -134 -4850 0
 4847  4848 -4849 -134  4851 0
 4847  4848 -4849 -134 -4852 0

c  2+1 --> break 
c    (-b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧  p_134) -> break
c  in CNF:
c     b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ -p_134 ∨ break
c  in DIMACS:
 4847 -4848  4849 -134 1162 0


c  2-1 --> 1
c    (-b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧ -p_134) -> (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0)
c  in CNF:
c     b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_2
c     b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_1
c     b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨  b^{2, 68}_0
c  in DIMACS:
 4847 -4848  4849  134 -4850 0
 4847 -4848  4849  134 -4851 0
 4847 -4848  4849  134  4852 0

c  1-1 --> 0
c    (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0 ∧ -p_134) -> (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧ -b^{2, 68}_0)
c  in CNF:
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_2
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_1
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_0
c  in DIMACS:
 4847  4848 -4849  134 -4850 0
 4847  4848 -4849  134 -4851 0
 4847  4848 -4849  134 -4852 0

c  0-1 --> -1
c    (-b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧ -p_134) -> ( b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0)
c  in CNF:
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨  b^{2, 68}_2
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_1
c     b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨  b^{2, 68}_0
c  in DIMACS:
 4847  4848  4849  134  4850 0
 4847  4848  4849  134 -4851 0
 4847  4848  4849  134  4852 0

c  -1-1 --> -2
c    ( b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧  b^{2, 67}_0 ∧ -p_134) -> ( b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0)
c  in CNF:
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨  b^{2, 68}_2
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨  b^{2, 68}_1
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨  p_134 ∨ -b^{2, 68}_0
c  in DIMACS:
-4847  4848 -4849  134  4850 0
-4847  4848 -4849  134  4851 0
-4847  4848 -4849  134 -4852 0

c  -2-1 --> break 
c    ( b^{2, 67}_2 ∧  b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧ -p_134) -> break
c  in CNF:
c    -b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨  b^{2, 67}_0 ∨  p_134 ∨ break
c  in DIMACS:
-4847 -4848  4849  134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 67}_2 ∧ -b^{2, 67}_1 ∧ -b^{2, 67}_0 ∧ true) 
c  in CNF:
c    -b^{2, 67}_2 ∨  b^{2, 67}_1 ∨  b^{2, 67}_0 ∨ false 
c  in DIMACS:
-4847  4848  4849  0

c  3 does not represent an automaton state.
c    -(-b^{2, 67}_2 ∧  b^{2, 67}_1 ∧  b^{2, 67}_0 ∧ true) 
c  in CNF:
c     b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ false 
c  in DIMACS:
 4847 -4848 -4849  0
c  -3 does not represent an automaton state.
c    -( b^{2, 67}_2 ∧  b^{2, 67}_1 ∧  b^{2, 67}_0 ∧ true) 
c  in CNF:
c    -b^{2, 67}_2 ∨ -b^{2, 67}_1 ∨ -b^{2, 67}_0 ∨ false 
c  in DIMACS:
-4847 -4848 -4849  0

c i = 68
c  -2+1 --> -1
c    ( b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧  p_136) -> ( b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0)
c  in CNF:
c    -b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨  b^{2, 69}_2
c    -b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_1
c    -b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨  b^{2, 69}_0
c  in DIMACS:
-4850 -4851  4852 -136  4853 0
-4850 -4851  4852 -136 -4854 0
-4850 -4851  4852 -136  4855 0

c  -1+1 --> 0
c    ( b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0 ∧  p_136) -> (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧ -b^{2, 69}_0)
c  in CNF:
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_2
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_1
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_0
c  in DIMACS:
-4850  4851 -4852 -136 -4853 0
-4850  4851 -4852 -136 -4854 0
-4850  4851 -4852 -136 -4855 0

c  0+1 --> 1
c    (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧  p_136) -> (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0)
c  in CNF:
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_2
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_1
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨  b^{2, 69}_0
c  in DIMACS:
 4850  4851  4852 -136 -4853 0
 4850  4851  4852 -136 -4854 0
 4850  4851  4852 -136  4855 0

c  1+1 --> 2
c    (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0 ∧  p_136) -> (-b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0)
c  in CNF:
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_2
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨  b^{2, 69}_1
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ -p_136 ∨ -b^{2, 69}_0
c  in DIMACS:
 4850  4851 -4852 -136 -4853 0
 4850  4851 -4852 -136  4854 0
 4850  4851 -4852 -136 -4855 0

c  2+1 --> break 
c    (-b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧  p_136) -> break
c  in CNF:
c     b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 4850 -4851  4852 -136 1162 0


c  2-1 --> 1
c    (-b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧ -p_136) -> (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0)
c  in CNF:
c     b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_2
c     b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_1
c     b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨  b^{2, 69}_0
c  in DIMACS:
 4850 -4851  4852  136 -4853 0
 4850 -4851  4852  136 -4854 0
 4850 -4851  4852  136  4855 0

c  1-1 --> 0
c    (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0 ∧ -p_136) -> (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧ -b^{2, 69}_0)
c  in CNF:
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_2
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_1
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_0
c  in DIMACS:
 4850  4851 -4852  136 -4853 0
 4850  4851 -4852  136 -4854 0
 4850  4851 -4852  136 -4855 0

c  0-1 --> -1
c    (-b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧ -p_136) -> ( b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0)
c  in CNF:
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨  b^{2, 69}_2
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_1
c     b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨  b^{2, 69}_0
c  in DIMACS:
 4850  4851  4852  136  4853 0
 4850  4851  4852  136 -4854 0
 4850  4851  4852  136  4855 0

c  -1-1 --> -2
c    ( b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧  b^{2, 68}_0 ∧ -p_136) -> ( b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0)
c  in CNF:
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨  b^{2, 69}_2
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨  b^{2, 69}_1
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨  p_136 ∨ -b^{2, 69}_0
c  in DIMACS:
-4850  4851 -4852  136  4853 0
-4850  4851 -4852  136  4854 0
-4850  4851 -4852  136 -4855 0

c  -2-1 --> break 
c    ( b^{2, 68}_2 ∧  b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨  b^{2, 68}_0 ∨  p_136 ∨ break
c  in DIMACS:
-4850 -4851  4852  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 68}_2 ∧ -b^{2, 68}_1 ∧ -b^{2, 68}_0 ∧ true) 
c  in CNF:
c    -b^{2, 68}_2 ∨  b^{2, 68}_1 ∨  b^{2, 68}_0 ∨ false 
c  in DIMACS:
-4850  4851  4852  0

c  3 does not represent an automaton state.
c    -(-b^{2, 68}_2 ∧  b^{2, 68}_1 ∧  b^{2, 68}_0 ∧ true) 
c  in CNF:
c     b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ false 
c  in DIMACS:
 4850 -4851 -4852  0
c  -3 does not represent an automaton state.
c    -( b^{2, 68}_2 ∧  b^{2, 68}_1 ∧  b^{2, 68}_0 ∧ true) 
c  in CNF:
c    -b^{2, 68}_2 ∨ -b^{2, 68}_1 ∨ -b^{2, 68}_0 ∨ false 
c  in DIMACS:
-4850 -4851 -4852  0

c i = 69
c  -2+1 --> -1
c    ( b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧  p_138) -> ( b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0)
c  in CNF:
c    -b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨  b^{2, 70}_2
c    -b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_1
c    -b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨  b^{2, 70}_0
c  in DIMACS:
-4853 -4854  4855 -138  4856 0
-4853 -4854  4855 -138 -4857 0
-4853 -4854  4855 -138  4858 0

c  -1+1 --> 0
c    ( b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0 ∧  p_138) -> (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧ -b^{2, 70}_0)
c  in CNF:
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_2
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_1
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_0
c  in DIMACS:
-4853  4854 -4855 -138 -4856 0
-4853  4854 -4855 -138 -4857 0
-4853  4854 -4855 -138 -4858 0

c  0+1 --> 1
c    (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧  p_138) -> (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0)
c  in CNF:
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_2
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_1
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨  b^{2, 70}_0
c  in DIMACS:
 4853  4854  4855 -138 -4856 0
 4853  4854  4855 -138 -4857 0
 4853  4854  4855 -138  4858 0

c  1+1 --> 2
c    (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0 ∧  p_138) -> (-b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0)
c  in CNF:
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_2
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨  b^{2, 70}_1
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ -p_138 ∨ -b^{2, 70}_0
c  in DIMACS:
 4853  4854 -4855 -138 -4856 0
 4853  4854 -4855 -138  4857 0
 4853  4854 -4855 -138 -4858 0

c  2+1 --> break 
c    (-b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧  p_138) -> break
c  in CNF:
c     b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 4853 -4854  4855 -138 1162 0


c  2-1 --> 1
c    (-b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧ -p_138) -> (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0)
c  in CNF:
c     b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_2
c     b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_1
c     b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨  b^{2, 70}_0
c  in DIMACS:
 4853 -4854  4855  138 -4856 0
 4853 -4854  4855  138 -4857 0
 4853 -4854  4855  138  4858 0

c  1-1 --> 0
c    (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0 ∧ -p_138) -> (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧ -b^{2, 70}_0)
c  in CNF:
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_2
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_1
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_0
c  in DIMACS:
 4853  4854 -4855  138 -4856 0
 4853  4854 -4855  138 -4857 0
 4853  4854 -4855  138 -4858 0

c  0-1 --> -1
c    (-b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧ -p_138) -> ( b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0)
c  in CNF:
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨  b^{2, 70}_2
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_1
c     b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨  b^{2, 70}_0
c  in DIMACS:
 4853  4854  4855  138  4856 0
 4853  4854  4855  138 -4857 0
 4853  4854  4855  138  4858 0

c  -1-1 --> -2
c    ( b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧  b^{2, 69}_0 ∧ -p_138) -> ( b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0)
c  in CNF:
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨  b^{2, 70}_2
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨  b^{2, 70}_1
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨  p_138 ∨ -b^{2, 70}_0
c  in DIMACS:
-4853  4854 -4855  138  4856 0
-4853  4854 -4855  138  4857 0
-4853  4854 -4855  138 -4858 0

c  -2-1 --> break 
c    ( b^{2, 69}_2 ∧  b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨  b^{2, 69}_0 ∨  p_138 ∨ break
c  in DIMACS:
-4853 -4854  4855  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 69}_2 ∧ -b^{2, 69}_1 ∧ -b^{2, 69}_0 ∧ true) 
c  in CNF:
c    -b^{2, 69}_2 ∨  b^{2, 69}_1 ∨  b^{2, 69}_0 ∨ false 
c  in DIMACS:
-4853  4854  4855  0

c  3 does not represent an automaton state.
c    -(-b^{2, 69}_2 ∧  b^{2, 69}_1 ∧  b^{2, 69}_0 ∧ true) 
c  in CNF:
c     b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ false 
c  in DIMACS:
 4853 -4854 -4855  0
c  -3 does not represent an automaton state.
c    -( b^{2, 69}_2 ∧  b^{2, 69}_1 ∧  b^{2, 69}_0 ∧ true) 
c  in CNF:
c    -b^{2, 69}_2 ∨ -b^{2, 69}_1 ∨ -b^{2, 69}_0 ∨ false 
c  in DIMACS:
-4853 -4854 -4855  0

c i = 70
c  -2+1 --> -1
c    ( b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧  p_140) -> ( b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0)
c  in CNF:
c    -b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨  b^{2, 71}_2
c    -b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_1
c    -b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨  b^{2, 71}_0
c  in DIMACS:
-4856 -4857  4858 -140  4859 0
-4856 -4857  4858 -140 -4860 0
-4856 -4857  4858 -140  4861 0

c  -1+1 --> 0
c    ( b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0 ∧  p_140) -> (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧ -b^{2, 71}_0)
c  in CNF:
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_2
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_1
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_0
c  in DIMACS:
-4856  4857 -4858 -140 -4859 0
-4856  4857 -4858 -140 -4860 0
-4856  4857 -4858 -140 -4861 0

c  0+1 --> 1
c    (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧  p_140) -> (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0)
c  in CNF:
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_2
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_1
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨  b^{2, 71}_0
c  in DIMACS:
 4856  4857  4858 -140 -4859 0
 4856  4857  4858 -140 -4860 0
 4856  4857  4858 -140  4861 0

c  1+1 --> 2
c    (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0 ∧  p_140) -> (-b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0)
c  in CNF:
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_2
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨  b^{2, 71}_1
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ -p_140 ∨ -b^{2, 71}_0
c  in DIMACS:
 4856  4857 -4858 -140 -4859 0
 4856  4857 -4858 -140  4860 0
 4856  4857 -4858 -140 -4861 0

c  2+1 --> break 
c    (-b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧  p_140) -> break
c  in CNF:
c     b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 4856 -4857  4858 -140 1162 0


c  2-1 --> 1
c    (-b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧ -p_140) -> (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0)
c  in CNF:
c     b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_2
c     b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_1
c     b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨  b^{2, 71}_0
c  in DIMACS:
 4856 -4857  4858  140 -4859 0
 4856 -4857  4858  140 -4860 0
 4856 -4857  4858  140  4861 0

c  1-1 --> 0
c    (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0 ∧ -p_140) -> (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧ -b^{2, 71}_0)
c  in CNF:
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_2
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_1
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_0
c  in DIMACS:
 4856  4857 -4858  140 -4859 0
 4856  4857 -4858  140 -4860 0
 4856  4857 -4858  140 -4861 0

c  0-1 --> -1
c    (-b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧ -p_140) -> ( b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0)
c  in CNF:
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨  b^{2, 71}_2
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_1
c     b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨  b^{2, 71}_0
c  in DIMACS:
 4856  4857  4858  140  4859 0
 4856  4857  4858  140 -4860 0
 4856  4857  4858  140  4861 0

c  -1-1 --> -2
c    ( b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧  b^{2, 70}_0 ∧ -p_140) -> ( b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0)
c  in CNF:
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨  b^{2, 71}_2
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨  b^{2, 71}_1
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨  p_140 ∨ -b^{2, 71}_0
c  in DIMACS:
-4856  4857 -4858  140  4859 0
-4856  4857 -4858  140  4860 0
-4856  4857 -4858  140 -4861 0

c  -2-1 --> break 
c    ( b^{2, 70}_2 ∧  b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨  b^{2, 70}_0 ∨  p_140 ∨ break
c  in DIMACS:
-4856 -4857  4858  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 70}_2 ∧ -b^{2, 70}_1 ∧ -b^{2, 70}_0 ∧ true) 
c  in CNF:
c    -b^{2, 70}_2 ∨  b^{2, 70}_1 ∨  b^{2, 70}_0 ∨ false 
c  in DIMACS:
-4856  4857  4858  0

c  3 does not represent an automaton state.
c    -(-b^{2, 70}_2 ∧  b^{2, 70}_1 ∧  b^{2, 70}_0 ∧ true) 
c  in CNF:
c     b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ false 
c  in DIMACS:
 4856 -4857 -4858  0
c  -3 does not represent an automaton state.
c    -( b^{2, 70}_2 ∧  b^{2, 70}_1 ∧  b^{2, 70}_0 ∧ true) 
c  in CNF:
c    -b^{2, 70}_2 ∨ -b^{2, 70}_1 ∨ -b^{2, 70}_0 ∨ false 
c  in DIMACS:
-4856 -4857 -4858  0

c i = 71
c  -2+1 --> -1
c    ( b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧  p_142) -> ( b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0)
c  in CNF:
c    -b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨  b^{2, 72}_2
c    -b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_1
c    -b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨  b^{2, 72}_0
c  in DIMACS:
-4859 -4860  4861 -142  4862 0
-4859 -4860  4861 -142 -4863 0
-4859 -4860  4861 -142  4864 0

c  -1+1 --> 0
c    ( b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0 ∧  p_142) -> (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧ -b^{2, 72}_0)
c  in CNF:
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_2
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_1
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_0
c  in DIMACS:
-4859  4860 -4861 -142 -4862 0
-4859  4860 -4861 -142 -4863 0
-4859  4860 -4861 -142 -4864 0

c  0+1 --> 1
c    (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧  p_142) -> (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0)
c  in CNF:
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_2
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_1
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨  b^{2, 72}_0
c  in DIMACS:
 4859  4860  4861 -142 -4862 0
 4859  4860  4861 -142 -4863 0
 4859  4860  4861 -142  4864 0

c  1+1 --> 2
c    (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0 ∧  p_142) -> (-b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0)
c  in CNF:
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_2
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨  b^{2, 72}_1
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ -p_142 ∨ -b^{2, 72}_0
c  in DIMACS:
 4859  4860 -4861 -142 -4862 0
 4859  4860 -4861 -142  4863 0
 4859  4860 -4861 -142 -4864 0

c  2+1 --> break 
c    (-b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧  p_142) -> break
c  in CNF:
c     b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ -p_142 ∨ break
c  in DIMACS:
 4859 -4860  4861 -142 1162 0


c  2-1 --> 1
c    (-b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧ -p_142) -> (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0)
c  in CNF:
c     b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_2
c     b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_1
c     b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨  b^{2, 72}_0
c  in DIMACS:
 4859 -4860  4861  142 -4862 0
 4859 -4860  4861  142 -4863 0
 4859 -4860  4861  142  4864 0

c  1-1 --> 0
c    (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0 ∧ -p_142) -> (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧ -b^{2, 72}_0)
c  in CNF:
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_2
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_1
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_0
c  in DIMACS:
 4859  4860 -4861  142 -4862 0
 4859  4860 -4861  142 -4863 0
 4859  4860 -4861  142 -4864 0

c  0-1 --> -1
c    (-b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧ -p_142) -> ( b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0)
c  in CNF:
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨  b^{2, 72}_2
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_1
c     b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨  b^{2, 72}_0
c  in DIMACS:
 4859  4860  4861  142  4862 0
 4859  4860  4861  142 -4863 0
 4859  4860  4861  142  4864 0

c  -1-1 --> -2
c    ( b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧  b^{2, 71}_0 ∧ -p_142) -> ( b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0)
c  in CNF:
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨  b^{2, 72}_2
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨  b^{2, 72}_1
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨  p_142 ∨ -b^{2, 72}_0
c  in DIMACS:
-4859  4860 -4861  142  4862 0
-4859  4860 -4861  142  4863 0
-4859  4860 -4861  142 -4864 0

c  -2-1 --> break 
c    ( b^{2, 71}_2 ∧  b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧ -p_142) -> break
c  in CNF:
c    -b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨  b^{2, 71}_0 ∨  p_142 ∨ break
c  in DIMACS:
-4859 -4860  4861  142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 71}_2 ∧ -b^{2, 71}_1 ∧ -b^{2, 71}_0 ∧ true) 
c  in CNF:
c    -b^{2, 71}_2 ∨  b^{2, 71}_1 ∨  b^{2, 71}_0 ∨ false 
c  in DIMACS:
-4859  4860  4861  0

c  3 does not represent an automaton state.
c    -(-b^{2, 71}_2 ∧  b^{2, 71}_1 ∧  b^{2, 71}_0 ∧ true) 
c  in CNF:
c     b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ false 
c  in DIMACS:
 4859 -4860 -4861  0
c  -3 does not represent an automaton state.
c    -( b^{2, 71}_2 ∧  b^{2, 71}_1 ∧  b^{2, 71}_0 ∧ true) 
c  in CNF:
c    -b^{2, 71}_2 ∨ -b^{2, 71}_1 ∨ -b^{2, 71}_0 ∨ false 
c  in DIMACS:
-4859 -4860 -4861  0

c i = 72
c  -2+1 --> -1
c    ( b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧  p_144) -> ( b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0)
c  in CNF:
c    -b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨  b^{2, 73}_2
c    -b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_1
c    -b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨  b^{2, 73}_0
c  in DIMACS:
-4862 -4863  4864 -144  4865 0
-4862 -4863  4864 -144 -4866 0
-4862 -4863  4864 -144  4867 0

c  -1+1 --> 0
c    ( b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0 ∧  p_144) -> (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧ -b^{2, 73}_0)
c  in CNF:
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_2
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_1
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_0
c  in DIMACS:
-4862  4863 -4864 -144 -4865 0
-4862  4863 -4864 -144 -4866 0
-4862  4863 -4864 -144 -4867 0

c  0+1 --> 1
c    (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧  p_144) -> (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0)
c  in CNF:
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_2
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_1
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨  b^{2, 73}_0
c  in DIMACS:
 4862  4863  4864 -144 -4865 0
 4862  4863  4864 -144 -4866 0
 4862  4863  4864 -144  4867 0

c  1+1 --> 2
c    (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0 ∧  p_144) -> (-b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0)
c  in CNF:
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_2
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨  b^{2, 73}_1
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ -p_144 ∨ -b^{2, 73}_0
c  in DIMACS:
 4862  4863 -4864 -144 -4865 0
 4862  4863 -4864 -144  4866 0
 4862  4863 -4864 -144 -4867 0

c  2+1 --> break 
c    (-b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧  p_144) -> break
c  in CNF:
c     b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 4862 -4863  4864 -144 1162 0


c  2-1 --> 1
c    (-b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧ -p_144) -> (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0)
c  in CNF:
c     b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_2
c     b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_1
c     b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨  b^{2, 73}_0
c  in DIMACS:
 4862 -4863  4864  144 -4865 0
 4862 -4863  4864  144 -4866 0
 4862 -4863  4864  144  4867 0

c  1-1 --> 0
c    (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0 ∧ -p_144) -> (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧ -b^{2, 73}_0)
c  in CNF:
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_2
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_1
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_0
c  in DIMACS:
 4862  4863 -4864  144 -4865 0
 4862  4863 -4864  144 -4866 0
 4862  4863 -4864  144 -4867 0

c  0-1 --> -1
c    (-b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧ -p_144) -> ( b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0)
c  in CNF:
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨  b^{2, 73}_2
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_1
c     b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨  b^{2, 73}_0
c  in DIMACS:
 4862  4863  4864  144  4865 0
 4862  4863  4864  144 -4866 0
 4862  4863  4864  144  4867 0

c  -1-1 --> -2
c    ( b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧  b^{2, 72}_0 ∧ -p_144) -> ( b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0)
c  in CNF:
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨  b^{2, 73}_2
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨  b^{2, 73}_1
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨  p_144 ∨ -b^{2, 73}_0
c  in DIMACS:
-4862  4863 -4864  144  4865 0
-4862  4863 -4864  144  4866 0
-4862  4863 -4864  144 -4867 0

c  -2-1 --> break 
c    ( b^{2, 72}_2 ∧  b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨  b^{2, 72}_0 ∨  p_144 ∨ break
c  in DIMACS:
-4862 -4863  4864  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 72}_2 ∧ -b^{2, 72}_1 ∧ -b^{2, 72}_0 ∧ true) 
c  in CNF:
c    -b^{2, 72}_2 ∨  b^{2, 72}_1 ∨  b^{2, 72}_0 ∨ false 
c  in DIMACS:
-4862  4863  4864  0

c  3 does not represent an automaton state.
c    -(-b^{2, 72}_2 ∧  b^{2, 72}_1 ∧  b^{2, 72}_0 ∧ true) 
c  in CNF:
c     b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ false 
c  in DIMACS:
 4862 -4863 -4864  0
c  -3 does not represent an automaton state.
c    -( b^{2, 72}_2 ∧  b^{2, 72}_1 ∧  b^{2, 72}_0 ∧ true) 
c  in CNF:
c    -b^{2, 72}_2 ∨ -b^{2, 72}_1 ∨ -b^{2, 72}_0 ∨ false 
c  in DIMACS:
-4862 -4863 -4864  0

c i = 73
c  -2+1 --> -1
c    ( b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧  p_146) -> ( b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0)
c  in CNF:
c    -b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨  b^{2, 74}_2
c    -b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_1
c    -b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨  b^{2, 74}_0
c  in DIMACS:
-4865 -4866  4867 -146  4868 0
-4865 -4866  4867 -146 -4869 0
-4865 -4866  4867 -146  4870 0

c  -1+1 --> 0
c    ( b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0 ∧  p_146) -> (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧ -b^{2, 74}_0)
c  in CNF:
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_2
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_1
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_0
c  in DIMACS:
-4865  4866 -4867 -146 -4868 0
-4865  4866 -4867 -146 -4869 0
-4865  4866 -4867 -146 -4870 0

c  0+1 --> 1
c    (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧  p_146) -> (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0)
c  in CNF:
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_2
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_1
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨  b^{2, 74}_0
c  in DIMACS:
 4865  4866  4867 -146 -4868 0
 4865  4866  4867 -146 -4869 0
 4865  4866  4867 -146  4870 0

c  1+1 --> 2
c    (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0 ∧  p_146) -> (-b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0)
c  in CNF:
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_2
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨  b^{2, 74}_1
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ -p_146 ∨ -b^{2, 74}_0
c  in DIMACS:
 4865  4866 -4867 -146 -4868 0
 4865  4866 -4867 -146  4869 0
 4865  4866 -4867 -146 -4870 0

c  2+1 --> break 
c    (-b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧  p_146) -> break
c  in CNF:
c     b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ -p_146 ∨ break
c  in DIMACS:
 4865 -4866  4867 -146 1162 0


c  2-1 --> 1
c    (-b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧ -p_146) -> (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0)
c  in CNF:
c     b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_2
c     b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_1
c     b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨  b^{2, 74}_0
c  in DIMACS:
 4865 -4866  4867  146 -4868 0
 4865 -4866  4867  146 -4869 0
 4865 -4866  4867  146  4870 0

c  1-1 --> 0
c    (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0 ∧ -p_146) -> (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧ -b^{2, 74}_0)
c  in CNF:
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_2
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_1
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_0
c  in DIMACS:
 4865  4866 -4867  146 -4868 0
 4865  4866 -4867  146 -4869 0
 4865  4866 -4867  146 -4870 0

c  0-1 --> -1
c    (-b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧ -p_146) -> ( b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0)
c  in CNF:
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨  b^{2, 74}_2
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_1
c     b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨  b^{2, 74}_0
c  in DIMACS:
 4865  4866  4867  146  4868 0
 4865  4866  4867  146 -4869 0
 4865  4866  4867  146  4870 0

c  -1-1 --> -2
c    ( b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧  b^{2, 73}_0 ∧ -p_146) -> ( b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0)
c  in CNF:
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨  b^{2, 74}_2
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨  b^{2, 74}_1
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨  p_146 ∨ -b^{2, 74}_0
c  in DIMACS:
-4865  4866 -4867  146  4868 0
-4865  4866 -4867  146  4869 0
-4865  4866 -4867  146 -4870 0

c  -2-1 --> break 
c    ( b^{2, 73}_2 ∧  b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧ -p_146) -> break
c  in CNF:
c    -b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨  b^{2, 73}_0 ∨  p_146 ∨ break
c  in DIMACS:
-4865 -4866  4867  146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 73}_2 ∧ -b^{2, 73}_1 ∧ -b^{2, 73}_0 ∧ true) 
c  in CNF:
c    -b^{2, 73}_2 ∨  b^{2, 73}_1 ∨  b^{2, 73}_0 ∨ false 
c  in DIMACS:
-4865  4866  4867  0

c  3 does not represent an automaton state.
c    -(-b^{2, 73}_2 ∧  b^{2, 73}_1 ∧  b^{2, 73}_0 ∧ true) 
c  in CNF:
c     b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ false 
c  in DIMACS:
 4865 -4866 -4867  0
c  -3 does not represent an automaton state.
c    -( b^{2, 73}_2 ∧  b^{2, 73}_1 ∧  b^{2, 73}_0 ∧ true) 
c  in CNF:
c    -b^{2, 73}_2 ∨ -b^{2, 73}_1 ∨ -b^{2, 73}_0 ∨ false 
c  in DIMACS:
-4865 -4866 -4867  0

c i = 74
c  -2+1 --> -1
c    ( b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧  p_148) -> ( b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0)
c  in CNF:
c    -b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨  b^{2, 75}_2
c    -b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_1
c    -b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨  b^{2, 75}_0
c  in DIMACS:
-4868 -4869  4870 -148  4871 0
-4868 -4869  4870 -148 -4872 0
-4868 -4869  4870 -148  4873 0

c  -1+1 --> 0
c    ( b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0 ∧  p_148) -> (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧ -b^{2, 75}_0)
c  in CNF:
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_2
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_1
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_0
c  in DIMACS:
-4868  4869 -4870 -148 -4871 0
-4868  4869 -4870 -148 -4872 0
-4868  4869 -4870 -148 -4873 0

c  0+1 --> 1
c    (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧  p_148) -> (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0)
c  in CNF:
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_2
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_1
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨  b^{2, 75}_0
c  in DIMACS:
 4868  4869  4870 -148 -4871 0
 4868  4869  4870 -148 -4872 0
 4868  4869  4870 -148  4873 0

c  1+1 --> 2
c    (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0 ∧  p_148) -> (-b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0)
c  in CNF:
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_2
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨  b^{2, 75}_1
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ -p_148 ∨ -b^{2, 75}_0
c  in DIMACS:
 4868  4869 -4870 -148 -4871 0
 4868  4869 -4870 -148  4872 0
 4868  4869 -4870 -148 -4873 0

c  2+1 --> break 
c    (-b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧  p_148) -> break
c  in CNF:
c     b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 4868 -4869  4870 -148 1162 0


c  2-1 --> 1
c    (-b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧ -p_148) -> (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0)
c  in CNF:
c     b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_2
c     b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_1
c     b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨  b^{2, 75}_0
c  in DIMACS:
 4868 -4869  4870  148 -4871 0
 4868 -4869  4870  148 -4872 0
 4868 -4869  4870  148  4873 0

c  1-1 --> 0
c    (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0 ∧ -p_148) -> (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧ -b^{2, 75}_0)
c  in CNF:
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_2
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_1
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_0
c  in DIMACS:
 4868  4869 -4870  148 -4871 0
 4868  4869 -4870  148 -4872 0
 4868  4869 -4870  148 -4873 0

c  0-1 --> -1
c    (-b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧ -p_148) -> ( b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0)
c  in CNF:
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨  b^{2, 75}_2
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_1
c     b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨  b^{2, 75}_0
c  in DIMACS:
 4868  4869  4870  148  4871 0
 4868  4869  4870  148 -4872 0
 4868  4869  4870  148  4873 0

c  -1-1 --> -2
c    ( b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧  b^{2, 74}_0 ∧ -p_148) -> ( b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0)
c  in CNF:
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨  b^{2, 75}_2
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨  b^{2, 75}_1
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨  p_148 ∨ -b^{2, 75}_0
c  in DIMACS:
-4868  4869 -4870  148  4871 0
-4868  4869 -4870  148  4872 0
-4868  4869 -4870  148 -4873 0

c  -2-1 --> break 
c    ( b^{2, 74}_2 ∧  b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨  b^{2, 74}_0 ∨  p_148 ∨ break
c  in DIMACS:
-4868 -4869  4870  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 74}_2 ∧ -b^{2, 74}_1 ∧ -b^{2, 74}_0 ∧ true) 
c  in CNF:
c    -b^{2, 74}_2 ∨  b^{2, 74}_1 ∨  b^{2, 74}_0 ∨ false 
c  in DIMACS:
-4868  4869  4870  0

c  3 does not represent an automaton state.
c    -(-b^{2, 74}_2 ∧  b^{2, 74}_1 ∧  b^{2, 74}_0 ∧ true) 
c  in CNF:
c     b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ false 
c  in DIMACS:
 4868 -4869 -4870  0
c  -3 does not represent an automaton state.
c    -( b^{2, 74}_2 ∧  b^{2, 74}_1 ∧  b^{2, 74}_0 ∧ true) 
c  in CNF:
c    -b^{2, 74}_2 ∨ -b^{2, 74}_1 ∨ -b^{2, 74}_0 ∨ false 
c  in DIMACS:
-4868 -4869 -4870  0

c i = 75
c  -2+1 --> -1
c    ( b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧  p_150) -> ( b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0)
c  in CNF:
c    -b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨  b^{2, 76}_2
c    -b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_1
c    -b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨  b^{2, 76}_0
c  in DIMACS:
-4871 -4872  4873 -150  4874 0
-4871 -4872  4873 -150 -4875 0
-4871 -4872  4873 -150  4876 0

c  -1+1 --> 0
c    ( b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0 ∧  p_150) -> (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧ -b^{2, 76}_0)
c  in CNF:
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_2
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_1
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_0
c  in DIMACS:
-4871  4872 -4873 -150 -4874 0
-4871  4872 -4873 -150 -4875 0
-4871  4872 -4873 -150 -4876 0

c  0+1 --> 1
c    (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧  p_150) -> (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0)
c  in CNF:
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_2
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_1
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨  b^{2, 76}_0
c  in DIMACS:
 4871  4872  4873 -150 -4874 0
 4871  4872  4873 -150 -4875 0
 4871  4872  4873 -150  4876 0

c  1+1 --> 2
c    (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0 ∧  p_150) -> (-b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0)
c  in CNF:
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_2
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨  b^{2, 76}_1
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ -p_150 ∨ -b^{2, 76}_0
c  in DIMACS:
 4871  4872 -4873 -150 -4874 0
 4871  4872 -4873 -150  4875 0
 4871  4872 -4873 -150 -4876 0

c  2+1 --> break 
c    (-b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧  p_150) -> break
c  in CNF:
c     b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 4871 -4872  4873 -150 1162 0


c  2-1 --> 1
c    (-b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧ -p_150) -> (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0)
c  in CNF:
c     b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_2
c     b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_1
c     b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨  b^{2, 76}_0
c  in DIMACS:
 4871 -4872  4873  150 -4874 0
 4871 -4872  4873  150 -4875 0
 4871 -4872  4873  150  4876 0

c  1-1 --> 0
c    (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0 ∧ -p_150) -> (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧ -b^{2, 76}_0)
c  in CNF:
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_2
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_1
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_0
c  in DIMACS:
 4871  4872 -4873  150 -4874 0
 4871  4872 -4873  150 -4875 0
 4871  4872 -4873  150 -4876 0

c  0-1 --> -1
c    (-b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧ -p_150) -> ( b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0)
c  in CNF:
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨  b^{2, 76}_2
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_1
c     b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨  b^{2, 76}_0
c  in DIMACS:
 4871  4872  4873  150  4874 0
 4871  4872  4873  150 -4875 0
 4871  4872  4873  150  4876 0

c  -1-1 --> -2
c    ( b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧  b^{2, 75}_0 ∧ -p_150) -> ( b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0)
c  in CNF:
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨  b^{2, 76}_2
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨  b^{2, 76}_1
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨  p_150 ∨ -b^{2, 76}_0
c  in DIMACS:
-4871  4872 -4873  150  4874 0
-4871  4872 -4873  150  4875 0
-4871  4872 -4873  150 -4876 0

c  -2-1 --> break 
c    ( b^{2, 75}_2 ∧  b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨  b^{2, 75}_0 ∨  p_150 ∨ break
c  in DIMACS:
-4871 -4872  4873  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 75}_2 ∧ -b^{2, 75}_1 ∧ -b^{2, 75}_0 ∧ true) 
c  in CNF:
c    -b^{2, 75}_2 ∨  b^{2, 75}_1 ∨  b^{2, 75}_0 ∨ false 
c  in DIMACS:
-4871  4872  4873  0

c  3 does not represent an automaton state.
c    -(-b^{2, 75}_2 ∧  b^{2, 75}_1 ∧  b^{2, 75}_0 ∧ true) 
c  in CNF:
c     b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ false 
c  in DIMACS:
 4871 -4872 -4873  0
c  -3 does not represent an automaton state.
c    -( b^{2, 75}_2 ∧  b^{2, 75}_1 ∧  b^{2, 75}_0 ∧ true) 
c  in CNF:
c    -b^{2, 75}_2 ∨ -b^{2, 75}_1 ∨ -b^{2, 75}_0 ∨ false 
c  in DIMACS:
-4871 -4872 -4873  0

c i = 76
c  -2+1 --> -1
c    ( b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧  p_152) -> ( b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0)
c  in CNF:
c    -b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨  b^{2, 77}_2
c    -b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_1
c    -b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨  b^{2, 77}_0
c  in DIMACS:
-4874 -4875  4876 -152  4877 0
-4874 -4875  4876 -152 -4878 0
-4874 -4875  4876 -152  4879 0

c  -1+1 --> 0
c    ( b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0 ∧  p_152) -> (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧ -b^{2, 77}_0)
c  in CNF:
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_2
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_1
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_0
c  in DIMACS:
-4874  4875 -4876 -152 -4877 0
-4874  4875 -4876 -152 -4878 0
-4874  4875 -4876 -152 -4879 0

c  0+1 --> 1
c    (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧  p_152) -> (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0)
c  in CNF:
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_2
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_1
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨  b^{2, 77}_0
c  in DIMACS:
 4874  4875  4876 -152 -4877 0
 4874  4875  4876 -152 -4878 0
 4874  4875  4876 -152  4879 0

c  1+1 --> 2
c    (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0 ∧  p_152) -> (-b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0)
c  in CNF:
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_2
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨  b^{2, 77}_1
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ -p_152 ∨ -b^{2, 77}_0
c  in DIMACS:
 4874  4875 -4876 -152 -4877 0
 4874  4875 -4876 -152  4878 0
 4874  4875 -4876 -152 -4879 0

c  2+1 --> break 
c    (-b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧  p_152) -> break
c  in CNF:
c     b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 4874 -4875  4876 -152 1162 0


c  2-1 --> 1
c    (-b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧ -p_152) -> (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0)
c  in CNF:
c     b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_2
c     b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_1
c     b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨  b^{2, 77}_0
c  in DIMACS:
 4874 -4875  4876  152 -4877 0
 4874 -4875  4876  152 -4878 0
 4874 -4875  4876  152  4879 0

c  1-1 --> 0
c    (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0 ∧ -p_152) -> (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧ -b^{2, 77}_0)
c  in CNF:
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_2
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_1
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_0
c  in DIMACS:
 4874  4875 -4876  152 -4877 0
 4874  4875 -4876  152 -4878 0
 4874  4875 -4876  152 -4879 0

c  0-1 --> -1
c    (-b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧ -p_152) -> ( b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0)
c  in CNF:
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨  b^{2, 77}_2
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_1
c     b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨  b^{2, 77}_0
c  in DIMACS:
 4874  4875  4876  152  4877 0
 4874  4875  4876  152 -4878 0
 4874  4875  4876  152  4879 0

c  -1-1 --> -2
c    ( b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧  b^{2, 76}_0 ∧ -p_152) -> ( b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0)
c  in CNF:
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨  b^{2, 77}_2
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨  b^{2, 77}_1
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨  p_152 ∨ -b^{2, 77}_0
c  in DIMACS:
-4874  4875 -4876  152  4877 0
-4874  4875 -4876  152  4878 0
-4874  4875 -4876  152 -4879 0

c  -2-1 --> break 
c    ( b^{2, 76}_2 ∧  b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨  b^{2, 76}_0 ∨  p_152 ∨ break
c  in DIMACS:
-4874 -4875  4876  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 76}_2 ∧ -b^{2, 76}_1 ∧ -b^{2, 76}_0 ∧ true) 
c  in CNF:
c    -b^{2, 76}_2 ∨  b^{2, 76}_1 ∨  b^{2, 76}_0 ∨ false 
c  in DIMACS:
-4874  4875  4876  0

c  3 does not represent an automaton state.
c    -(-b^{2, 76}_2 ∧  b^{2, 76}_1 ∧  b^{2, 76}_0 ∧ true) 
c  in CNF:
c     b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ false 
c  in DIMACS:
 4874 -4875 -4876  0
c  -3 does not represent an automaton state.
c    -( b^{2, 76}_2 ∧  b^{2, 76}_1 ∧  b^{2, 76}_0 ∧ true) 
c  in CNF:
c    -b^{2, 76}_2 ∨ -b^{2, 76}_1 ∨ -b^{2, 76}_0 ∨ false 
c  in DIMACS:
-4874 -4875 -4876  0

c i = 77
c  -2+1 --> -1
c    ( b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧  p_154) -> ( b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0)
c  in CNF:
c    -b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨  b^{2, 78}_2
c    -b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_1
c    -b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨  b^{2, 78}_0
c  in DIMACS:
-4877 -4878  4879 -154  4880 0
-4877 -4878  4879 -154 -4881 0
-4877 -4878  4879 -154  4882 0

c  -1+1 --> 0
c    ( b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0 ∧  p_154) -> (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧ -b^{2, 78}_0)
c  in CNF:
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_2
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_1
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_0
c  in DIMACS:
-4877  4878 -4879 -154 -4880 0
-4877  4878 -4879 -154 -4881 0
-4877  4878 -4879 -154 -4882 0

c  0+1 --> 1
c    (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧  p_154) -> (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0)
c  in CNF:
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_2
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_1
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨  b^{2, 78}_0
c  in DIMACS:
 4877  4878  4879 -154 -4880 0
 4877  4878  4879 -154 -4881 0
 4877  4878  4879 -154  4882 0

c  1+1 --> 2
c    (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0 ∧  p_154) -> (-b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0)
c  in CNF:
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_2
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨  b^{2, 78}_1
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ -p_154 ∨ -b^{2, 78}_0
c  in DIMACS:
 4877  4878 -4879 -154 -4880 0
 4877  4878 -4879 -154  4881 0
 4877  4878 -4879 -154 -4882 0

c  2+1 --> break 
c    (-b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧  p_154) -> break
c  in CNF:
c     b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 4877 -4878  4879 -154 1162 0


c  2-1 --> 1
c    (-b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧ -p_154) -> (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0)
c  in CNF:
c     b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_2
c     b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_1
c     b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨  b^{2, 78}_0
c  in DIMACS:
 4877 -4878  4879  154 -4880 0
 4877 -4878  4879  154 -4881 0
 4877 -4878  4879  154  4882 0

c  1-1 --> 0
c    (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0 ∧ -p_154) -> (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧ -b^{2, 78}_0)
c  in CNF:
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_2
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_1
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_0
c  in DIMACS:
 4877  4878 -4879  154 -4880 0
 4877  4878 -4879  154 -4881 0
 4877  4878 -4879  154 -4882 0

c  0-1 --> -1
c    (-b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧ -p_154) -> ( b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0)
c  in CNF:
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨  b^{2, 78}_2
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_1
c     b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨  b^{2, 78}_0
c  in DIMACS:
 4877  4878  4879  154  4880 0
 4877  4878  4879  154 -4881 0
 4877  4878  4879  154  4882 0

c  -1-1 --> -2
c    ( b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧  b^{2, 77}_0 ∧ -p_154) -> ( b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0)
c  in CNF:
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨  b^{2, 78}_2
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨  b^{2, 78}_1
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨  p_154 ∨ -b^{2, 78}_0
c  in DIMACS:
-4877  4878 -4879  154  4880 0
-4877  4878 -4879  154  4881 0
-4877  4878 -4879  154 -4882 0

c  -2-1 --> break 
c    ( b^{2, 77}_2 ∧  b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨  b^{2, 77}_0 ∨  p_154 ∨ break
c  in DIMACS:
-4877 -4878  4879  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 77}_2 ∧ -b^{2, 77}_1 ∧ -b^{2, 77}_0 ∧ true) 
c  in CNF:
c    -b^{2, 77}_2 ∨  b^{2, 77}_1 ∨  b^{2, 77}_0 ∨ false 
c  in DIMACS:
-4877  4878  4879  0

c  3 does not represent an automaton state.
c    -(-b^{2, 77}_2 ∧  b^{2, 77}_1 ∧  b^{2, 77}_0 ∧ true) 
c  in CNF:
c     b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ false 
c  in DIMACS:
 4877 -4878 -4879  0
c  -3 does not represent an automaton state.
c    -( b^{2, 77}_2 ∧  b^{2, 77}_1 ∧  b^{2, 77}_0 ∧ true) 
c  in CNF:
c    -b^{2, 77}_2 ∨ -b^{2, 77}_1 ∨ -b^{2, 77}_0 ∨ false 
c  in DIMACS:
-4877 -4878 -4879  0

c i = 78
c  -2+1 --> -1
c    ( b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧  p_156) -> ( b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0)
c  in CNF:
c    -b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨  b^{2, 79}_2
c    -b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_1
c    -b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨  b^{2, 79}_0
c  in DIMACS:
-4880 -4881  4882 -156  4883 0
-4880 -4881  4882 -156 -4884 0
-4880 -4881  4882 -156  4885 0

c  -1+1 --> 0
c    ( b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0 ∧  p_156) -> (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧ -b^{2, 79}_0)
c  in CNF:
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_2
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_1
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_0
c  in DIMACS:
-4880  4881 -4882 -156 -4883 0
-4880  4881 -4882 -156 -4884 0
-4880  4881 -4882 -156 -4885 0

c  0+1 --> 1
c    (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧  p_156) -> (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0)
c  in CNF:
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_2
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_1
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨  b^{2, 79}_0
c  in DIMACS:
 4880  4881  4882 -156 -4883 0
 4880  4881  4882 -156 -4884 0
 4880  4881  4882 -156  4885 0

c  1+1 --> 2
c    (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0 ∧  p_156) -> (-b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0)
c  in CNF:
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_2
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨  b^{2, 79}_1
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ -p_156 ∨ -b^{2, 79}_0
c  in DIMACS:
 4880  4881 -4882 -156 -4883 0
 4880  4881 -4882 -156  4884 0
 4880  4881 -4882 -156 -4885 0

c  2+1 --> break 
c    (-b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧  p_156) -> break
c  in CNF:
c     b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 4880 -4881  4882 -156 1162 0


c  2-1 --> 1
c    (-b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧ -p_156) -> (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0)
c  in CNF:
c     b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_2
c     b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_1
c     b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨  b^{2, 79}_0
c  in DIMACS:
 4880 -4881  4882  156 -4883 0
 4880 -4881  4882  156 -4884 0
 4880 -4881  4882  156  4885 0

c  1-1 --> 0
c    (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0 ∧ -p_156) -> (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧ -b^{2, 79}_0)
c  in CNF:
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_2
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_1
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_0
c  in DIMACS:
 4880  4881 -4882  156 -4883 0
 4880  4881 -4882  156 -4884 0
 4880  4881 -4882  156 -4885 0

c  0-1 --> -1
c    (-b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧ -p_156) -> ( b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0)
c  in CNF:
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨  b^{2, 79}_2
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_1
c     b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨  b^{2, 79}_0
c  in DIMACS:
 4880  4881  4882  156  4883 0
 4880  4881  4882  156 -4884 0
 4880  4881  4882  156  4885 0

c  -1-1 --> -2
c    ( b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧  b^{2, 78}_0 ∧ -p_156) -> ( b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0)
c  in CNF:
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨  b^{2, 79}_2
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨  b^{2, 79}_1
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨  p_156 ∨ -b^{2, 79}_0
c  in DIMACS:
-4880  4881 -4882  156  4883 0
-4880  4881 -4882  156  4884 0
-4880  4881 -4882  156 -4885 0

c  -2-1 --> break 
c    ( b^{2, 78}_2 ∧  b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨  b^{2, 78}_0 ∨  p_156 ∨ break
c  in DIMACS:
-4880 -4881  4882  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 78}_2 ∧ -b^{2, 78}_1 ∧ -b^{2, 78}_0 ∧ true) 
c  in CNF:
c    -b^{2, 78}_2 ∨  b^{2, 78}_1 ∨  b^{2, 78}_0 ∨ false 
c  in DIMACS:
-4880  4881  4882  0

c  3 does not represent an automaton state.
c    -(-b^{2, 78}_2 ∧  b^{2, 78}_1 ∧  b^{2, 78}_0 ∧ true) 
c  in CNF:
c     b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ false 
c  in DIMACS:
 4880 -4881 -4882  0
c  -3 does not represent an automaton state.
c    -( b^{2, 78}_2 ∧  b^{2, 78}_1 ∧  b^{2, 78}_0 ∧ true) 
c  in CNF:
c    -b^{2, 78}_2 ∨ -b^{2, 78}_1 ∨ -b^{2, 78}_0 ∨ false 
c  in DIMACS:
-4880 -4881 -4882  0

c i = 79
c  -2+1 --> -1
c    ( b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧  p_158) -> ( b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0)
c  in CNF:
c    -b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨  b^{2, 80}_2
c    -b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_1
c    -b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨  b^{2, 80}_0
c  in DIMACS:
-4883 -4884  4885 -158  4886 0
-4883 -4884  4885 -158 -4887 0
-4883 -4884  4885 -158  4888 0

c  -1+1 --> 0
c    ( b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0 ∧  p_158) -> (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧ -b^{2, 80}_0)
c  in CNF:
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_2
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_1
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_0
c  in DIMACS:
-4883  4884 -4885 -158 -4886 0
-4883  4884 -4885 -158 -4887 0
-4883  4884 -4885 -158 -4888 0

c  0+1 --> 1
c    (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧  p_158) -> (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0)
c  in CNF:
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_2
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_1
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨  b^{2, 80}_0
c  in DIMACS:
 4883  4884  4885 -158 -4886 0
 4883  4884  4885 -158 -4887 0
 4883  4884  4885 -158  4888 0

c  1+1 --> 2
c    (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0 ∧  p_158) -> (-b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0)
c  in CNF:
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_2
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨  b^{2, 80}_1
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ -p_158 ∨ -b^{2, 80}_0
c  in DIMACS:
 4883  4884 -4885 -158 -4886 0
 4883  4884 -4885 -158  4887 0
 4883  4884 -4885 -158 -4888 0

c  2+1 --> break 
c    (-b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧  p_158) -> break
c  in CNF:
c     b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ -p_158 ∨ break
c  in DIMACS:
 4883 -4884  4885 -158 1162 0


c  2-1 --> 1
c    (-b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧ -p_158) -> (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0)
c  in CNF:
c     b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_2
c     b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_1
c     b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨  b^{2, 80}_0
c  in DIMACS:
 4883 -4884  4885  158 -4886 0
 4883 -4884  4885  158 -4887 0
 4883 -4884  4885  158  4888 0

c  1-1 --> 0
c    (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0 ∧ -p_158) -> (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧ -b^{2, 80}_0)
c  in CNF:
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_2
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_1
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_0
c  in DIMACS:
 4883  4884 -4885  158 -4886 0
 4883  4884 -4885  158 -4887 0
 4883  4884 -4885  158 -4888 0

c  0-1 --> -1
c    (-b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧ -p_158) -> ( b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0)
c  in CNF:
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨  b^{2, 80}_2
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_1
c     b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨  b^{2, 80}_0
c  in DIMACS:
 4883  4884  4885  158  4886 0
 4883  4884  4885  158 -4887 0
 4883  4884  4885  158  4888 0

c  -1-1 --> -2
c    ( b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧  b^{2, 79}_0 ∧ -p_158) -> ( b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0)
c  in CNF:
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨  b^{2, 80}_2
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨  b^{2, 80}_1
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨  p_158 ∨ -b^{2, 80}_0
c  in DIMACS:
-4883  4884 -4885  158  4886 0
-4883  4884 -4885  158  4887 0
-4883  4884 -4885  158 -4888 0

c  -2-1 --> break 
c    ( b^{2, 79}_2 ∧  b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧ -p_158) -> break
c  in CNF:
c    -b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨  b^{2, 79}_0 ∨  p_158 ∨ break
c  in DIMACS:
-4883 -4884  4885  158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 79}_2 ∧ -b^{2, 79}_1 ∧ -b^{2, 79}_0 ∧ true) 
c  in CNF:
c    -b^{2, 79}_2 ∨  b^{2, 79}_1 ∨  b^{2, 79}_0 ∨ false 
c  in DIMACS:
-4883  4884  4885  0

c  3 does not represent an automaton state.
c    -(-b^{2, 79}_2 ∧  b^{2, 79}_1 ∧  b^{2, 79}_0 ∧ true) 
c  in CNF:
c     b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ false 
c  in DIMACS:
 4883 -4884 -4885  0
c  -3 does not represent an automaton state.
c    -( b^{2, 79}_2 ∧  b^{2, 79}_1 ∧  b^{2, 79}_0 ∧ true) 
c  in CNF:
c    -b^{2, 79}_2 ∨ -b^{2, 79}_1 ∨ -b^{2, 79}_0 ∨ false 
c  in DIMACS:
-4883 -4884 -4885  0

c i = 80
c  -2+1 --> -1
c    ( b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧  p_160) -> ( b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0)
c  in CNF:
c    -b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨  b^{2, 81}_2
c    -b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_1
c    -b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨  b^{2, 81}_0
c  in DIMACS:
-4886 -4887  4888 -160  4889 0
-4886 -4887  4888 -160 -4890 0
-4886 -4887  4888 -160  4891 0

c  -1+1 --> 0
c    ( b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0 ∧  p_160) -> (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧ -b^{2, 81}_0)
c  in CNF:
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_2
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_1
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_0
c  in DIMACS:
-4886  4887 -4888 -160 -4889 0
-4886  4887 -4888 -160 -4890 0
-4886  4887 -4888 -160 -4891 0

c  0+1 --> 1
c    (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧  p_160) -> (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0)
c  in CNF:
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_2
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_1
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨  b^{2, 81}_0
c  in DIMACS:
 4886  4887  4888 -160 -4889 0
 4886  4887  4888 -160 -4890 0
 4886  4887  4888 -160  4891 0

c  1+1 --> 2
c    (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0 ∧  p_160) -> (-b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0)
c  in CNF:
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_2
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨  b^{2, 81}_1
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ -p_160 ∨ -b^{2, 81}_0
c  in DIMACS:
 4886  4887 -4888 -160 -4889 0
 4886  4887 -4888 -160  4890 0
 4886  4887 -4888 -160 -4891 0

c  2+1 --> break 
c    (-b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧  p_160) -> break
c  in CNF:
c     b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 4886 -4887  4888 -160 1162 0


c  2-1 --> 1
c    (-b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧ -p_160) -> (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0)
c  in CNF:
c     b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_2
c     b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_1
c     b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨  b^{2, 81}_0
c  in DIMACS:
 4886 -4887  4888  160 -4889 0
 4886 -4887  4888  160 -4890 0
 4886 -4887  4888  160  4891 0

c  1-1 --> 0
c    (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0 ∧ -p_160) -> (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧ -b^{2, 81}_0)
c  in CNF:
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_2
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_1
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_0
c  in DIMACS:
 4886  4887 -4888  160 -4889 0
 4886  4887 -4888  160 -4890 0
 4886  4887 -4888  160 -4891 0

c  0-1 --> -1
c    (-b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧ -p_160) -> ( b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0)
c  in CNF:
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨  b^{2, 81}_2
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_1
c     b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨  b^{2, 81}_0
c  in DIMACS:
 4886  4887  4888  160  4889 0
 4886  4887  4888  160 -4890 0
 4886  4887  4888  160  4891 0

c  -1-1 --> -2
c    ( b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧  b^{2, 80}_0 ∧ -p_160) -> ( b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0)
c  in CNF:
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨  b^{2, 81}_2
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨  b^{2, 81}_1
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨  p_160 ∨ -b^{2, 81}_0
c  in DIMACS:
-4886  4887 -4888  160  4889 0
-4886  4887 -4888  160  4890 0
-4886  4887 -4888  160 -4891 0

c  -2-1 --> break 
c    ( b^{2, 80}_2 ∧  b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨  b^{2, 80}_0 ∨  p_160 ∨ break
c  in DIMACS:
-4886 -4887  4888  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 80}_2 ∧ -b^{2, 80}_1 ∧ -b^{2, 80}_0 ∧ true) 
c  in CNF:
c    -b^{2, 80}_2 ∨  b^{2, 80}_1 ∨  b^{2, 80}_0 ∨ false 
c  in DIMACS:
-4886  4887  4888  0

c  3 does not represent an automaton state.
c    -(-b^{2, 80}_2 ∧  b^{2, 80}_1 ∧  b^{2, 80}_0 ∧ true) 
c  in CNF:
c     b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ false 
c  in DIMACS:
 4886 -4887 -4888  0
c  -3 does not represent an automaton state.
c    -( b^{2, 80}_2 ∧  b^{2, 80}_1 ∧  b^{2, 80}_0 ∧ true) 
c  in CNF:
c    -b^{2, 80}_2 ∨ -b^{2, 80}_1 ∨ -b^{2, 80}_0 ∨ false 
c  in DIMACS:
-4886 -4887 -4888  0

c i = 81
c  -2+1 --> -1
c    ( b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧  p_162) -> ( b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0)
c  in CNF:
c    -b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨  b^{2, 82}_2
c    -b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_1
c    -b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨  b^{2, 82}_0
c  in DIMACS:
-4889 -4890  4891 -162  4892 0
-4889 -4890  4891 -162 -4893 0
-4889 -4890  4891 -162  4894 0

c  -1+1 --> 0
c    ( b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0 ∧  p_162) -> (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧ -b^{2, 82}_0)
c  in CNF:
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_2
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_1
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_0
c  in DIMACS:
-4889  4890 -4891 -162 -4892 0
-4889  4890 -4891 -162 -4893 0
-4889  4890 -4891 -162 -4894 0

c  0+1 --> 1
c    (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧  p_162) -> (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0)
c  in CNF:
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_2
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_1
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨  b^{2, 82}_0
c  in DIMACS:
 4889  4890  4891 -162 -4892 0
 4889  4890  4891 -162 -4893 0
 4889  4890  4891 -162  4894 0

c  1+1 --> 2
c    (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0 ∧  p_162) -> (-b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0)
c  in CNF:
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_2
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨  b^{2, 82}_1
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ -p_162 ∨ -b^{2, 82}_0
c  in DIMACS:
 4889  4890 -4891 -162 -4892 0
 4889  4890 -4891 -162  4893 0
 4889  4890 -4891 -162 -4894 0

c  2+1 --> break 
c    (-b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧  p_162) -> break
c  in CNF:
c     b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 4889 -4890  4891 -162 1162 0


c  2-1 --> 1
c    (-b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧ -p_162) -> (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0)
c  in CNF:
c     b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_2
c     b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_1
c     b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨  b^{2, 82}_0
c  in DIMACS:
 4889 -4890  4891  162 -4892 0
 4889 -4890  4891  162 -4893 0
 4889 -4890  4891  162  4894 0

c  1-1 --> 0
c    (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0 ∧ -p_162) -> (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧ -b^{2, 82}_0)
c  in CNF:
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_2
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_1
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_0
c  in DIMACS:
 4889  4890 -4891  162 -4892 0
 4889  4890 -4891  162 -4893 0
 4889  4890 -4891  162 -4894 0

c  0-1 --> -1
c    (-b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧ -p_162) -> ( b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0)
c  in CNF:
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨  b^{2, 82}_2
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_1
c     b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨  b^{2, 82}_0
c  in DIMACS:
 4889  4890  4891  162  4892 0
 4889  4890  4891  162 -4893 0
 4889  4890  4891  162  4894 0

c  -1-1 --> -2
c    ( b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧  b^{2, 81}_0 ∧ -p_162) -> ( b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0)
c  in CNF:
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨  b^{2, 82}_2
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨  b^{2, 82}_1
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨  p_162 ∨ -b^{2, 82}_0
c  in DIMACS:
-4889  4890 -4891  162  4892 0
-4889  4890 -4891  162  4893 0
-4889  4890 -4891  162 -4894 0

c  -2-1 --> break 
c    ( b^{2, 81}_2 ∧  b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨  b^{2, 81}_0 ∨  p_162 ∨ break
c  in DIMACS:
-4889 -4890  4891  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 81}_2 ∧ -b^{2, 81}_1 ∧ -b^{2, 81}_0 ∧ true) 
c  in CNF:
c    -b^{2, 81}_2 ∨  b^{2, 81}_1 ∨  b^{2, 81}_0 ∨ false 
c  in DIMACS:
-4889  4890  4891  0

c  3 does not represent an automaton state.
c    -(-b^{2, 81}_2 ∧  b^{2, 81}_1 ∧  b^{2, 81}_0 ∧ true) 
c  in CNF:
c     b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ false 
c  in DIMACS:
 4889 -4890 -4891  0
c  -3 does not represent an automaton state.
c    -( b^{2, 81}_2 ∧  b^{2, 81}_1 ∧  b^{2, 81}_0 ∧ true) 
c  in CNF:
c    -b^{2, 81}_2 ∨ -b^{2, 81}_1 ∨ -b^{2, 81}_0 ∨ false 
c  in DIMACS:
-4889 -4890 -4891  0

c i = 82
c  -2+1 --> -1
c    ( b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧  p_164) -> ( b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0)
c  in CNF:
c    -b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨  b^{2, 83}_2
c    -b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_1
c    -b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨  b^{2, 83}_0
c  in DIMACS:
-4892 -4893  4894 -164  4895 0
-4892 -4893  4894 -164 -4896 0
-4892 -4893  4894 -164  4897 0

c  -1+1 --> 0
c    ( b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0 ∧  p_164) -> (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧ -b^{2, 83}_0)
c  in CNF:
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_2
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_1
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_0
c  in DIMACS:
-4892  4893 -4894 -164 -4895 0
-4892  4893 -4894 -164 -4896 0
-4892  4893 -4894 -164 -4897 0

c  0+1 --> 1
c    (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧  p_164) -> (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0)
c  in CNF:
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_2
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_1
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨  b^{2, 83}_0
c  in DIMACS:
 4892  4893  4894 -164 -4895 0
 4892  4893  4894 -164 -4896 0
 4892  4893  4894 -164  4897 0

c  1+1 --> 2
c    (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0 ∧  p_164) -> (-b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0)
c  in CNF:
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_2
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨  b^{2, 83}_1
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ -p_164 ∨ -b^{2, 83}_0
c  in DIMACS:
 4892  4893 -4894 -164 -4895 0
 4892  4893 -4894 -164  4896 0
 4892  4893 -4894 -164 -4897 0

c  2+1 --> break 
c    (-b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧  p_164) -> break
c  in CNF:
c     b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 4892 -4893  4894 -164 1162 0


c  2-1 --> 1
c    (-b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧ -p_164) -> (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0)
c  in CNF:
c     b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_2
c     b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_1
c     b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨  b^{2, 83}_0
c  in DIMACS:
 4892 -4893  4894  164 -4895 0
 4892 -4893  4894  164 -4896 0
 4892 -4893  4894  164  4897 0

c  1-1 --> 0
c    (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0 ∧ -p_164) -> (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧ -b^{2, 83}_0)
c  in CNF:
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_2
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_1
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_0
c  in DIMACS:
 4892  4893 -4894  164 -4895 0
 4892  4893 -4894  164 -4896 0
 4892  4893 -4894  164 -4897 0

c  0-1 --> -1
c    (-b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧ -p_164) -> ( b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0)
c  in CNF:
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨  b^{2, 83}_2
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_1
c     b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨  b^{2, 83}_0
c  in DIMACS:
 4892  4893  4894  164  4895 0
 4892  4893  4894  164 -4896 0
 4892  4893  4894  164  4897 0

c  -1-1 --> -2
c    ( b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧  b^{2, 82}_0 ∧ -p_164) -> ( b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0)
c  in CNF:
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨  b^{2, 83}_2
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨  b^{2, 83}_1
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨  p_164 ∨ -b^{2, 83}_0
c  in DIMACS:
-4892  4893 -4894  164  4895 0
-4892  4893 -4894  164  4896 0
-4892  4893 -4894  164 -4897 0

c  -2-1 --> break 
c    ( b^{2, 82}_2 ∧  b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨  b^{2, 82}_0 ∨  p_164 ∨ break
c  in DIMACS:
-4892 -4893  4894  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 82}_2 ∧ -b^{2, 82}_1 ∧ -b^{2, 82}_0 ∧ true) 
c  in CNF:
c    -b^{2, 82}_2 ∨  b^{2, 82}_1 ∨  b^{2, 82}_0 ∨ false 
c  in DIMACS:
-4892  4893  4894  0

c  3 does not represent an automaton state.
c    -(-b^{2, 82}_2 ∧  b^{2, 82}_1 ∧  b^{2, 82}_0 ∧ true) 
c  in CNF:
c     b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ false 
c  in DIMACS:
 4892 -4893 -4894  0
c  -3 does not represent an automaton state.
c    -( b^{2, 82}_2 ∧  b^{2, 82}_1 ∧  b^{2, 82}_0 ∧ true) 
c  in CNF:
c    -b^{2, 82}_2 ∨ -b^{2, 82}_1 ∨ -b^{2, 82}_0 ∨ false 
c  in DIMACS:
-4892 -4893 -4894  0

c i = 83
c  -2+1 --> -1
c    ( b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧  p_166) -> ( b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0)
c  in CNF:
c    -b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨  b^{2, 84}_2
c    -b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_1
c    -b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨  b^{2, 84}_0
c  in DIMACS:
-4895 -4896  4897 -166  4898 0
-4895 -4896  4897 -166 -4899 0
-4895 -4896  4897 -166  4900 0

c  -1+1 --> 0
c    ( b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0 ∧  p_166) -> (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧ -b^{2, 84}_0)
c  in CNF:
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_2
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_1
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_0
c  in DIMACS:
-4895  4896 -4897 -166 -4898 0
-4895  4896 -4897 -166 -4899 0
-4895  4896 -4897 -166 -4900 0

c  0+1 --> 1
c    (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧  p_166) -> (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0)
c  in CNF:
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_2
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_1
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨  b^{2, 84}_0
c  in DIMACS:
 4895  4896  4897 -166 -4898 0
 4895  4896  4897 -166 -4899 0
 4895  4896  4897 -166  4900 0

c  1+1 --> 2
c    (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0 ∧  p_166) -> (-b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0)
c  in CNF:
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_2
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨  b^{2, 84}_1
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ -p_166 ∨ -b^{2, 84}_0
c  in DIMACS:
 4895  4896 -4897 -166 -4898 0
 4895  4896 -4897 -166  4899 0
 4895  4896 -4897 -166 -4900 0

c  2+1 --> break 
c    (-b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧  p_166) -> break
c  in CNF:
c     b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ -p_166 ∨ break
c  in DIMACS:
 4895 -4896  4897 -166 1162 0


c  2-1 --> 1
c    (-b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧ -p_166) -> (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0)
c  in CNF:
c     b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_2
c     b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_1
c     b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨  b^{2, 84}_0
c  in DIMACS:
 4895 -4896  4897  166 -4898 0
 4895 -4896  4897  166 -4899 0
 4895 -4896  4897  166  4900 0

c  1-1 --> 0
c    (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0 ∧ -p_166) -> (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧ -b^{2, 84}_0)
c  in CNF:
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_2
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_1
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_0
c  in DIMACS:
 4895  4896 -4897  166 -4898 0
 4895  4896 -4897  166 -4899 0
 4895  4896 -4897  166 -4900 0

c  0-1 --> -1
c    (-b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧ -p_166) -> ( b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0)
c  in CNF:
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨  b^{2, 84}_2
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_1
c     b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨  b^{2, 84}_0
c  in DIMACS:
 4895  4896  4897  166  4898 0
 4895  4896  4897  166 -4899 0
 4895  4896  4897  166  4900 0

c  -1-1 --> -2
c    ( b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧  b^{2, 83}_0 ∧ -p_166) -> ( b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0)
c  in CNF:
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨  b^{2, 84}_2
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨  b^{2, 84}_1
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨  p_166 ∨ -b^{2, 84}_0
c  in DIMACS:
-4895  4896 -4897  166  4898 0
-4895  4896 -4897  166  4899 0
-4895  4896 -4897  166 -4900 0

c  -2-1 --> break 
c    ( b^{2, 83}_2 ∧  b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧ -p_166) -> break
c  in CNF:
c    -b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨  b^{2, 83}_0 ∨  p_166 ∨ break
c  in DIMACS:
-4895 -4896  4897  166 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 83}_2 ∧ -b^{2, 83}_1 ∧ -b^{2, 83}_0 ∧ true) 
c  in CNF:
c    -b^{2, 83}_2 ∨  b^{2, 83}_1 ∨  b^{2, 83}_0 ∨ false 
c  in DIMACS:
-4895  4896  4897  0

c  3 does not represent an automaton state.
c    -(-b^{2, 83}_2 ∧  b^{2, 83}_1 ∧  b^{2, 83}_0 ∧ true) 
c  in CNF:
c     b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ false 
c  in DIMACS:
 4895 -4896 -4897  0
c  -3 does not represent an automaton state.
c    -( b^{2, 83}_2 ∧  b^{2, 83}_1 ∧  b^{2, 83}_0 ∧ true) 
c  in CNF:
c    -b^{2, 83}_2 ∨ -b^{2, 83}_1 ∨ -b^{2, 83}_0 ∨ false 
c  in DIMACS:
-4895 -4896 -4897  0

c i = 84
c  -2+1 --> -1
c    ( b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧  p_168) -> ( b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0)
c  in CNF:
c    -b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨  b^{2, 85}_2
c    -b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_1
c    -b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨  b^{2, 85}_0
c  in DIMACS:
-4898 -4899  4900 -168  4901 0
-4898 -4899  4900 -168 -4902 0
-4898 -4899  4900 -168  4903 0

c  -1+1 --> 0
c    ( b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0 ∧  p_168) -> (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧ -b^{2, 85}_0)
c  in CNF:
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_2
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_1
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_0
c  in DIMACS:
-4898  4899 -4900 -168 -4901 0
-4898  4899 -4900 -168 -4902 0
-4898  4899 -4900 -168 -4903 0

c  0+1 --> 1
c    (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧  p_168) -> (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0)
c  in CNF:
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_2
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_1
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨  b^{2, 85}_0
c  in DIMACS:
 4898  4899  4900 -168 -4901 0
 4898  4899  4900 -168 -4902 0
 4898  4899  4900 -168  4903 0

c  1+1 --> 2
c    (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0 ∧  p_168) -> (-b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0)
c  in CNF:
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_2
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨  b^{2, 85}_1
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ -p_168 ∨ -b^{2, 85}_0
c  in DIMACS:
 4898  4899 -4900 -168 -4901 0
 4898  4899 -4900 -168  4902 0
 4898  4899 -4900 -168 -4903 0

c  2+1 --> break 
c    (-b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧  p_168) -> break
c  in CNF:
c     b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 4898 -4899  4900 -168 1162 0


c  2-1 --> 1
c    (-b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧ -p_168) -> (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0)
c  in CNF:
c     b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_2
c     b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_1
c     b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨  b^{2, 85}_0
c  in DIMACS:
 4898 -4899  4900  168 -4901 0
 4898 -4899  4900  168 -4902 0
 4898 -4899  4900  168  4903 0

c  1-1 --> 0
c    (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0 ∧ -p_168) -> (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧ -b^{2, 85}_0)
c  in CNF:
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_2
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_1
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_0
c  in DIMACS:
 4898  4899 -4900  168 -4901 0
 4898  4899 -4900  168 -4902 0
 4898  4899 -4900  168 -4903 0

c  0-1 --> -1
c    (-b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧ -p_168) -> ( b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0)
c  in CNF:
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨  b^{2, 85}_2
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_1
c     b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨  b^{2, 85}_0
c  in DIMACS:
 4898  4899  4900  168  4901 0
 4898  4899  4900  168 -4902 0
 4898  4899  4900  168  4903 0

c  -1-1 --> -2
c    ( b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧  b^{2, 84}_0 ∧ -p_168) -> ( b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0)
c  in CNF:
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨  b^{2, 85}_2
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨  b^{2, 85}_1
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨  p_168 ∨ -b^{2, 85}_0
c  in DIMACS:
-4898  4899 -4900  168  4901 0
-4898  4899 -4900  168  4902 0
-4898  4899 -4900  168 -4903 0

c  -2-1 --> break 
c    ( b^{2, 84}_2 ∧  b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨  b^{2, 84}_0 ∨  p_168 ∨ break
c  in DIMACS:
-4898 -4899  4900  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 84}_2 ∧ -b^{2, 84}_1 ∧ -b^{2, 84}_0 ∧ true) 
c  in CNF:
c    -b^{2, 84}_2 ∨  b^{2, 84}_1 ∨  b^{2, 84}_0 ∨ false 
c  in DIMACS:
-4898  4899  4900  0

c  3 does not represent an automaton state.
c    -(-b^{2, 84}_2 ∧  b^{2, 84}_1 ∧  b^{2, 84}_0 ∧ true) 
c  in CNF:
c     b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ false 
c  in DIMACS:
 4898 -4899 -4900  0
c  -3 does not represent an automaton state.
c    -( b^{2, 84}_2 ∧  b^{2, 84}_1 ∧  b^{2, 84}_0 ∧ true) 
c  in CNF:
c    -b^{2, 84}_2 ∨ -b^{2, 84}_1 ∨ -b^{2, 84}_0 ∨ false 
c  in DIMACS:
-4898 -4899 -4900  0

c i = 85
c  -2+1 --> -1
c    ( b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧  p_170) -> ( b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0)
c  in CNF:
c    -b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨  b^{2, 86}_2
c    -b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_1
c    -b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨  b^{2, 86}_0
c  in DIMACS:
-4901 -4902  4903 -170  4904 0
-4901 -4902  4903 -170 -4905 0
-4901 -4902  4903 -170  4906 0

c  -1+1 --> 0
c    ( b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0 ∧  p_170) -> (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧ -b^{2, 86}_0)
c  in CNF:
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_2
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_1
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_0
c  in DIMACS:
-4901  4902 -4903 -170 -4904 0
-4901  4902 -4903 -170 -4905 0
-4901  4902 -4903 -170 -4906 0

c  0+1 --> 1
c    (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧  p_170) -> (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0)
c  in CNF:
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_2
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_1
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨  b^{2, 86}_0
c  in DIMACS:
 4901  4902  4903 -170 -4904 0
 4901  4902  4903 -170 -4905 0
 4901  4902  4903 -170  4906 0

c  1+1 --> 2
c    (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0 ∧  p_170) -> (-b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0)
c  in CNF:
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_2
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨  b^{2, 86}_1
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ -p_170 ∨ -b^{2, 86}_0
c  in DIMACS:
 4901  4902 -4903 -170 -4904 0
 4901  4902 -4903 -170  4905 0
 4901  4902 -4903 -170 -4906 0

c  2+1 --> break 
c    (-b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧  p_170) -> break
c  in CNF:
c     b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 4901 -4902  4903 -170 1162 0


c  2-1 --> 1
c    (-b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧ -p_170) -> (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0)
c  in CNF:
c     b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_2
c     b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_1
c     b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨  b^{2, 86}_0
c  in DIMACS:
 4901 -4902  4903  170 -4904 0
 4901 -4902  4903  170 -4905 0
 4901 -4902  4903  170  4906 0

c  1-1 --> 0
c    (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0 ∧ -p_170) -> (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧ -b^{2, 86}_0)
c  in CNF:
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_2
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_1
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_0
c  in DIMACS:
 4901  4902 -4903  170 -4904 0
 4901  4902 -4903  170 -4905 0
 4901  4902 -4903  170 -4906 0

c  0-1 --> -1
c    (-b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧ -p_170) -> ( b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0)
c  in CNF:
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨  b^{2, 86}_2
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_1
c     b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨  b^{2, 86}_0
c  in DIMACS:
 4901  4902  4903  170  4904 0
 4901  4902  4903  170 -4905 0
 4901  4902  4903  170  4906 0

c  -1-1 --> -2
c    ( b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧  b^{2, 85}_0 ∧ -p_170) -> ( b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0)
c  in CNF:
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨  b^{2, 86}_2
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨  b^{2, 86}_1
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨  p_170 ∨ -b^{2, 86}_0
c  in DIMACS:
-4901  4902 -4903  170  4904 0
-4901  4902 -4903  170  4905 0
-4901  4902 -4903  170 -4906 0

c  -2-1 --> break 
c    ( b^{2, 85}_2 ∧  b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨  b^{2, 85}_0 ∨  p_170 ∨ break
c  in DIMACS:
-4901 -4902  4903  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 85}_2 ∧ -b^{2, 85}_1 ∧ -b^{2, 85}_0 ∧ true) 
c  in CNF:
c    -b^{2, 85}_2 ∨  b^{2, 85}_1 ∨  b^{2, 85}_0 ∨ false 
c  in DIMACS:
-4901  4902  4903  0

c  3 does not represent an automaton state.
c    -(-b^{2, 85}_2 ∧  b^{2, 85}_1 ∧  b^{2, 85}_0 ∧ true) 
c  in CNF:
c     b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ false 
c  in DIMACS:
 4901 -4902 -4903  0
c  -3 does not represent an automaton state.
c    -( b^{2, 85}_2 ∧  b^{2, 85}_1 ∧  b^{2, 85}_0 ∧ true) 
c  in CNF:
c    -b^{2, 85}_2 ∨ -b^{2, 85}_1 ∨ -b^{2, 85}_0 ∨ false 
c  in DIMACS:
-4901 -4902 -4903  0

c i = 86
c  -2+1 --> -1
c    ( b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧  p_172) -> ( b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0)
c  in CNF:
c    -b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨  b^{2, 87}_2
c    -b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_1
c    -b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨  b^{2, 87}_0
c  in DIMACS:
-4904 -4905  4906 -172  4907 0
-4904 -4905  4906 -172 -4908 0
-4904 -4905  4906 -172  4909 0

c  -1+1 --> 0
c    ( b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0 ∧  p_172) -> (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧ -b^{2, 87}_0)
c  in CNF:
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_2
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_1
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_0
c  in DIMACS:
-4904  4905 -4906 -172 -4907 0
-4904  4905 -4906 -172 -4908 0
-4904  4905 -4906 -172 -4909 0

c  0+1 --> 1
c    (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧  p_172) -> (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0)
c  in CNF:
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_2
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_1
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨  b^{2, 87}_0
c  in DIMACS:
 4904  4905  4906 -172 -4907 0
 4904  4905  4906 -172 -4908 0
 4904  4905  4906 -172  4909 0

c  1+1 --> 2
c    (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0 ∧  p_172) -> (-b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0)
c  in CNF:
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_2
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨  b^{2, 87}_1
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ -p_172 ∨ -b^{2, 87}_0
c  in DIMACS:
 4904  4905 -4906 -172 -4907 0
 4904  4905 -4906 -172  4908 0
 4904  4905 -4906 -172 -4909 0

c  2+1 --> break 
c    (-b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧  p_172) -> break
c  in CNF:
c     b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 4904 -4905  4906 -172 1162 0


c  2-1 --> 1
c    (-b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧ -p_172) -> (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0)
c  in CNF:
c     b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_2
c     b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_1
c     b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨  b^{2, 87}_0
c  in DIMACS:
 4904 -4905  4906  172 -4907 0
 4904 -4905  4906  172 -4908 0
 4904 -4905  4906  172  4909 0

c  1-1 --> 0
c    (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0 ∧ -p_172) -> (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧ -b^{2, 87}_0)
c  in CNF:
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_2
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_1
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_0
c  in DIMACS:
 4904  4905 -4906  172 -4907 0
 4904  4905 -4906  172 -4908 0
 4904  4905 -4906  172 -4909 0

c  0-1 --> -1
c    (-b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧ -p_172) -> ( b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0)
c  in CNF:
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨  b^{2, 87}_2
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_1
c     b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨  b^{2, 87}_0
c  in DIMACS:
 4904  4905  4906  172  4907 0
 4904  4905  4906  172 -4908 0
 4904  4905  4906  172  4909 0

c  -1-1 --> -2
c    ( b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧  b^{2, 86}_0 ∧ -p_172) -> ( b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0)
c  in CNF:
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨  b^{2, 87}_2
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨  b^{2, 87}_1
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨  p_172 ∨ -b^{2, 87}_0
c  in DIMACS:
-4904  4905 -4906  172  4907 0
-4904  4905 -4906  172  4908 0
-4904  4905 -4906  172 -4909 0

c  -2-1 --> break 
c    ( b^{2, 86}_2 ∧  b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨  b^{2, 86}_0 ∨  p_172 ∨ break
c  in DIMACS:
-4904 -4905  4906  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 86}_2 ∧ -b^{2, 86}_1 ∧ -b^{2, 86}_0 ∧ true) 
c  in CNF:
c    -b^{2, 86}_2 ∨  b^{2, 86}_1 ∨  b^{2, 86}_0 ∨ false 
c  in DIMACS:
-4904  4905  4906  0

c  3 does not represent an automaton state.
c    -(-b^{2, 86}_2 ∧  b^{2, 86}_1 ∧  b^{2, 86}_0 ∧ true) 
c  in CNF:
c     b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ false 
c  in DIMACS:
 4904 -4905 -4906  0
c  -3 does not represent an automaton state.
c    -( b^{2, 86}_2 ∧  b^{2, 86}_1 ∧  b^{2, 86}_0 ∧ true) 
c  in CNF:
c    -b^{2, 86}_2 ∨ -b^{2, 86}_1 ∨ -b^{2, 86}_0 ∨ false 
c  in DIMACS:
-4904 -4905 -4906  0

c i = 87
c  -2+1 --> -1
c    ( b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧  p_174) -> ( b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0)
c  in CNF:
c    -b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨  b^{2, 88}_2
c    -b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_1
c    -b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨  b^{2, 88}_0
c  in DIMACS:
-4907 -4908  4909 -174  4910 0
-4907 -4908  4909 -174 -4911 0
-4907 -4908  4909 -174  4912 0

c  -1+1 --> 0
c    ( b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0 ∧  p_174) -> (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧ -b^{2, 88}_0)
c  in CNF:
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_2
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_1
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_0
c  in DIMACS:
-4907  4908 -4909 -174 -4910 0
-4907  4908 -4909 -174 -4911 0
-4907  4908 -4909 -174 -4912 0

c  0+1 --> 1
c    (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧  p_174) -> (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0)
c  in CNF:
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_2
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_1
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨  b^{2, 88}_0
c  in DIMACS:
 4907  4908  4909 -174 -4910 0
 4907  4908  4909 -174 -4911 0
 4907  4908  4909 -174  4912 0

c  1+1 --> 2
c    (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0 ∧  p_174) -> (-b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0)
c  in CNF:
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_2
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨  b^{2, 88}_1
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ -p_174 ∨ -b^{2, 88}_0
c  in DIMACS:
 4907  4908 -4909 -174 -4910 0
 4907  4908 -4909 -174  4911 0
 4907  4908 -4909 -174 -4912 0

c  2+1 --> break 
c    (-b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧  p_174) -> break
c  in CNF:
c     b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 4907 -4908  4909 -174 1162 0


c  2-1 --> 1
c    (-b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧ -p_174) -> (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0)
c  in CNF:
c     b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_2
c     b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_1
c     b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨  b^{2, 88}_0
c  in DIMACS:
 4907 -4908  4909  174 -4910 0
 4907 -4908  4909  174 -4911 0
 4907 -4908  4909  174  4912 0

c  1-1 --> 0
c    (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0 ∧ -p_174) -> (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧ -b^{2, 88}_0)
c  in CNF:
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_2
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_1
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_0
c  in DIMACS:
 4907  4908 -4909  174 -4910 0
 4907  4908 -4909  174 -4911 0
 4907  4908 -4909  174 -4912 0

c  0-1 --> -1
c    (-b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧ -p_174) -> ( b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0)
c  in CNF:
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨  b^{2, 88}_2
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_1
c     b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨  b^{2, 88}_0
c  in DIMACS:
 4907  4908  4909  174  4910 0
 4907  4908  4909  174 -4911 0
 4907  4908  4909  174  4912 0

c  -1-1 --> -2
c    ( b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧  b^{2, 87}_0 ∧ -p_174) -> ( b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0)
c  in CNF:
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨  b^{2, 88}_2
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨  b^{2, 88}_1
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨  p_174 ∨ -b^{2, 88}_0
c  in DIMACS:
-4907  4908 -4909  174  4910 0
-4907  4908 -4909  174  4911 0
-4907  4908 -4909  174 -4912 0

c  -2-1 --> break 
c    ( b^{2, 87}_2 ∧  b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨  b^{2, 87}_0 ∨  p_174 ∨ break
c  in DIMACS:
-4907 -4908  4909  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 87}_2 ∧ -b^{2, 87}_1 ∧ -b^{2, 87}_0 ∧ true) 
c  in CNF:
c    -b^{2, 87}_2 ∨  b^{2, 87}_1 ∨  b^{2, 87}_0 ∨ false 
c  in DIMACS:
-4907  4908  4909  0

c  3 does not represent an automaton state.
c    -(-b^{2, 87}_2 ∧  b^{2, 87}_1 ∧  b^{2, 87}_0 ∧ true) 
c  in CNF:
c     b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ false 
c  in DIMACS:
 4907 -4908 -4909  0
c  -3 does not represent an automaton state.
c    -( b^{2, 87}_2 ∧  b^{2, 87}_1 ∧  b^{2, 87}_0 ∧ true) 
c  in CNF:
c    -b^{2, 87}_2 ∨ -b^{2, 87}_1 ∨ -b^{2, 87}_0 ∨ false 
c  in DIMACS:
-4907 -4908 -4909  0

c i = 88
c  -2+1 --> -1
c    ( b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧  p_176) -> ( b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0)
c  in CNF:
c    -b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨  b^{2, 89}_2
c    -b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_1
c    -b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨  b^{2, 89}_0
c  in DIMACS:
-4910 -4911  4912 -176  4913 0
-4910 -4911  4912 -176 -4914 0
-4910 -4911  4912 -176  4915 0

c  -1+1 --> 0
c    ( b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0 ∧  p_176) -> (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧ -b^{2, 89}_0)
c  in CNF:
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_2
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_1
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_0
c  in DIMACS:
-4910  4911 -4912 -176 -4913 0
-4910  4911 -4912 -176 -4914 0
-4910  4911 -4912 -176 -4915 0

c  0+1 --> 1
c    (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧  p_176) -> (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0)
c  in CNF:
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_2
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_1
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨  b^{2, 89}_0
c  in DIMACS:
 4910  4911  4912 -176 -4913 0
 4910  4911  4912 -176 -4914 0
 4910  4911  4912 -176  4915 0

c  1+1 --> 2
c    (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0 ∧  p_176) -> (-b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0)
c  in CNF:
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_2
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨  b^{2, 89}_1
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ -p_176 ∨ -b^{2, 89}_0
c  in DIMACS:
 4910  4911 -4912 -176 -4913 0
 4910  4911 -4912 -176  4914 0
 4910  4911 -4912 -176 -4915 0

c  2+1 --> break 
c    (-b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧  p_176) -> break
c  in CNF:
c     b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 4910 -4911  4912 -176 1162 0


c  2-1 --> 1
c    (-b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧ -p_176) -> (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0)
c  in CNF:
c     b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_2
c     b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_1
c     b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨  b^{2, 89}_0
c  in DIMACS:
 4910 -4911  4912  176 -4913 0
 4910 -4911  4912  176 -4914 0
 4910 -4911  4912  176  4915 0

c  1-1 --> 0
c    (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0 ∧ -p_176) -> (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧ -b^{2, 89}_0)
c  in CNF:
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_2
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_1
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_0
c  in DIMACS:
 4910  4911 -4912  176 -4913 0
 4910  4911 -4912  176 -4914 0
 4910  4911 -4912  176 -4915 0

c  0-1 --> -1
c    (-b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧ -p_176) -> ( b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0)
c  in CNF:
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨  b^{2, 89}_2
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_1
c     b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨  b^{2, 89}_0
c  in DIMACS:
 4910  4911  4912  176  4913 0
 4910  4911  4912  176 -4914 0
 4910  4911  4912  176  4915 0

c  -1-1 --> -2
c    ( b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧  b^{2, 88}_0 ∧ -p_176) -> ( b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0)
c  in CNF:
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨  b^{2, 89}_2
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨  b^{2, 89}_1
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨  p_176 ∨ -b^{2, 89}_0
c  in DIMACS:
-4910  4911 -4912  176  4913 0
-4910  4911 -4912  176  4914 0
-4910  4911 -4912  176 -4915 0

c  -2-1 --> break 
c    ( b^{2, 88}_2 ∧  b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨  b^{2, 88}_0 ∨  p_176 ∨ break
c  in DIMACS:
-4910 -4911  4912  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 88}_2 ∧ -b^{2, 88}_1 ∧ -b^{2, 88}_0 ∧ true) 
c  in CNF:
c    -b^{2, 88}_2 ∨  b^{2, 88}_1 ∨  b^{2, 88}_0 ∨ false 
c  in DIMACS:
-4910  4911  4912  0

c  3 does not represent an automaton state.
c    -(-b^{2, 88}_2 ∧  b^{2, 88}_1 ∧  b^{2, 88}_0 ∧ true) 
c  in CNF:
c     b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ false 
c  in DIMACS:
 4910 -4911 -4912  0
c  -3 does not represent an automaton state.
c    -( b^{2, 88}_2 ∧  b^{2, 88}_1 ∧  b^{2, 88}_0 ∧ true) 
c  in CNF:
c    -b^{2, 88}_2 ∨ -b^{2, 88}_1 ∨ -b^{2, 88}_0 ∨ false 
c  in DIMACS:
-4910 -4911 -4912  0

c i = 89
c  -2+1 --> -1
c    ( b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧  p_178) -> ( b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0)
c  in CNF:
c    -b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨  b^{2, 90}_2
c    -b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_1
c    -b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨  b^{2, 90}_0
c  in DIMACS:
-4913 -4914  4915 -178  4916 0
-4913 -4914  4915 -178 -4917 0
-4913 -4914  4915 -178  4918 0

c  -1+1 --> 0
c    ( b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0 ∧  p_178) -> (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧ -b^{2, 90}_0)
c  in CNF:
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_2
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_1
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_0
c  in DIMACS:
-4913  4914 -4915 -178 -4916 0
-4913  4914 -4915 -178 -4917 0
-4913  4914 -4915 -178 -4918 0

c  0+1 --> 1
c    (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧  p_178) -> (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0)
c  in CNF:
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_2
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_1
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨  b^{2, 90}_0
c  in DIMACS:
 4913  4914  4915 -178 -4916 0
 4913  4914  4915 -178 -4917 0
 4913  4914  4915 -178  4918 0

c  1+1 --> 2
c    (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0 ∧  p_178) -> (-b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0)
c  in CNF:
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_2
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨  b^{2, 90}_1
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ -p_178 ∨ -b^{2, 90}_0
c  in DIMACS:
 4913  4914 -4915 -178 -4916 0
 4913  4914 -4915 -178  4917 0
 4913  4914 -4915 -178 -4918 0

c  2+1 --> break 
c    (-b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧  p_178) -> break
c  in CNF:
c     b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ -p_178 ∨ break
c  in DIMACS:
 4913 -4914  4915 -178 1162 0


c  2-1 --> 1
c    (-b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧ -p_178) -> (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0)
c  in CNF:
c     b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_2
c     b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_1
c     b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨  b^{2, 90}_0
c  in DIMACS:
 4913 -4914  4915  178 -4916 0
 4913 -4914  4915  178 -4917 0
 4913 -4914  4915  178  4918 0

c  1-1 --> 0
c    (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0 ∧ -p_178) -> (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧ -b^{2, 90}_0)
c  in CNF:
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_2
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_1
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_0
c  in DIMACS:
 4913  4914 -4915  178 -4916 0
 4913  4914 -4915  178 -4917 0
 4913  4914 -4915  178 -4918 0

c  0-1 --> -1
c    (-b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧ -p_178) -> ( b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0)
c  in CNF:
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨  b^{2, 90}_2
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_1
c     b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨  b^{2, 90}_0
c  in DIMACS:
 4913  4914  4915  178  4916 0
 4913  4914  4915  178 -4917 0
 4913  4914  4915  178  4918 0

c  -1-1 --> -2
c    ( b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧  b^{2, 89}_0 ∧ -p_178) -> ( b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0)
c  in CNF:
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨  b^{2, 90}_2
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨  b^{2, 90}_1
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨  p_178 ∨ -b^{2, 90}_0
c  in DIMACS:
-4913  4914 -4915  178  4916 0
-4913  4914 -4915  178  4917 0
-4913  4914 -4915  178 -4918 0

c  -2-1 --> break 
c    ( b^{2, 89}_2 ∧  b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧ -p_178) -> break
c  in CNF:
c    -b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨  b^{2, 89}_0 ∨  p_178 ∨ break
c  in DIMACS:
-4913 -4914  4915  178 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 89}_2 ∧ -b^{2, 89}_1 ∧ -b^{2, 89}_0 ∧ true) 
c  in CNF:
c    -b^{2, 89}_2 ∨  b^{2, 89}_1 ∨  b^{2, 89}_0 ∨ false 
c  in DIMACS:
-4913  4914  4915  0

c  3 does not represent an automaton state.
c    -(-b^{2, 89}_2 ∧  b^{2, 89}_1 ∧  b^{2, 89}_0 ∧ true) 
c  in CNF:
c     b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ false 
c  in DIMACS:
 4913 -4914 -4915  0
c  -3 does not represent an automaton state.
c    -( b^{2, 89}_2 ∧  b^{2, 89}_1 ∧  b^{2, 89}_0 ∧ true) 
c  in CNF:
c    -b^{2, 89}_2 ∨ -b^{2, 89}_1 ∨ -b^{2, 89}_0 ∨ false 
c  in DIMACS:
-4913 -4914 -4915  0

c i = 90
c  -2+1 --> -1
c    ( b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧  p_180) -> ( b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0)
c  in CNF:
c    -b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨  b^{2, 91}_2
c    -b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_1
c    -b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨  b^{2, 91}_0
c  in DIMACS:
-4916 -4917  4918 -180  4919 0
-4916 -4917  4918 -180 -4920 0
-4916 -4917  4918 -180  4921 0

c  -1+1 --> 0
c    ( b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0 ∧  p_180) -> (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧ -b^{2, 91}_0)
c  in CNF:
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_2
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_1
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_0
c  in DIMACS:
-4916  4917 -4918 -180 -4919 0
-4916  4917 -4918 -180 -4920 0
-4916  4917 -4918 -180 -4921 0

c  0+1 --> 1
c    (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧  p_180) -> (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0)
c  in CNF:
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_2
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_1
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨  b^{2, 91}_0
c  in DIMACS:
 4916  4917  4918 -180 -4919 0
 4916  4917  4918 -180 -4920 0
 4916  4917  4918 -180  4921 0

c  1+1 --> 2
c    (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0 ∧  p_180) -> (-b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0)
c  in CNF:
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_2
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨  b^{2, 91}_1
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ -p_180 ∨ -b^{2, 91}_0
c  in DIMACS:
 4916  4917 -4918 -180 -4919 0
 4916  4917 -4918 -180  4920 0
 4916  4917 -4918 -180 -4921 0

c  2+1 --> break 
c    (-b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧  p_180) -> break
c  in CNF:
c     b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 4916 -4917  4918 -180 1162 0


c  2-1 --> 1
c    (-b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧ -p_180) -> (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0)
c  in CNF:
c     b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_2
c     b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_1
c     b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨  b^{2, 91}_0
c  in DIMACS:
 4916 -4917  4918  180 -4919 0
 4916 -4917  4918  180 -4920 0
 4916 -4917  4918  180  4921 0

c  1-1 --> 0
c    (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0 ∧ -p_180) -> (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧ -b^{2, 91}_0)
c  in CNF:
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_2
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_1
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_0
c  in DIMACS:
 4916  4917 -4918  180 -4919 0
 4916  4917 -4918  180 -4920 0
 4916  4917 -4918  180 -4921 0

c  0-1 --> -1
c    (-b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧ -p_180) -> ( b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0)
c  in CNF:
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨  b^{2, 91}_2
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_1
c     b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨  b^{2, 91}_0
c  in DIMACS:
 4916  4917  4918  180  4919 0
 4916  4917  4918  180 -4920 0
 4916  4917  4918  180  4921 0

c  -1-1 --> -2
c    ( b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧  b^{2, 90}_0 ∧ -p_180) -> ( b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0)
c  in CNF:
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨  b^{2, 91}_2
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨  b^{2, 91}_1
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨  p_180 ∨ -b^{2, 91}_0
c  in DIMACS:
-4916  4917 -4918  180  4919 0
-4916  4917 -4918  180  4920 0
-4916  4917 -4918  180 -4921 0

c  -2-1 --> break 
c    ( b^{2, 90}_2 ∧  b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨  b^{2, 90}_0 ∨  p_180 ∨ break
c  in DIMACS:
-4916 -4917  4918  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 90}_2 ∧ -b^{2, 90}_1 ∧ -b^{2, 90}_0 ∧ true) 
c  in CNF:
c    -b^{2, 90}_2 ∨  b^{2, 90}_1 ∨  b^{2, 90}_0 ∨ false 
c  in DIMACS:
-4916  4917  4918  0

c  3 does not represent an automaton state.
c    -(-b^{2, 90}_2 ∧  b^{2, 90}_1 ∧  b^{2, 90}_0 ∧ true) 
c  in CNF:
c     b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ false 
c  in DIMACS:
 4916 -4917 -4918  0
c  -3 does not represent an automaton state.
c    -( b^{2, 90}_2 ∧  b^{2, 90}_1 ∧  b^{2, 90}_0 ∧ true) 
c  in CNF:
c    -b^{2, 90}_2 ∨ -b^{2, 90}_1 ∨ -b^{2, 90}_0 ∨ false 
c  in DIMACS:
-4916 -4917 -4918  0

c i = 91
c  -2+1 --> -1
c    ( b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧  p_182) -> ( b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0)
c  in CNF:
c    -b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨  b^{2, 92}_2
c    -b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_1
c    -b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨  b^{2, 92}_0
c  in DIMACS:
-4919 -4920  4921 -182  4922 0
-4919 -4920  4921 -182 -4923 0
-4919 -4920  4921 -182  4924 0

c  -1+1 --> 0
c    ( b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0 ∧  p_182) -> (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧ -b^{2, 92}_0)
c  in CNF:
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_2
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_1
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_0
c  in DIMACS:
-4919  4920 -4921 -182 -4922 0
-4919  4920 -4921 -182 -4923 0
-4919  4920 -4921 -182 -4924 0

c  0+1 --> 1
c    (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧  p_182) -> (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0)
c  in CNF:
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_2
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_1
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨  b^{2, 92}_0
c  in DIMACS:
 4919  4920  4921 -182 -4922 0
 4919  4920  4921 -182 -4923 0
 4919  4920  4921 -182  4924 0

c  1+1 --> 2
c    (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0 ∧  p_182) -> (-b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0)
c  in CNF:
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_2
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨  b^{2, 92}_1
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ -p_182 ∨ -b^{2, 92}_0
c  in DIMACS:
 4919  4920 -4921 -182 -4922 0
 4919  4920 -4921 -182  4923 0
 4919  4920 -4921 -182 -4924 0

c  2+1 --> break 
c    (-b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧  p_182) -> break
c  in CNF:
c     b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 4919 -4920  4921 -182 1162 0


c  2-1 --> 1
c    (-b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧ -p_182) -> (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0)
c  in CNF:
c     b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_2
c     b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_1
c     b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨  b^{2, 92}_0
c  in DIMACS:
 4919 -4920  4921  182 -4922 0
 4919 -4920  4921  182 -4923 0
 4919 -4920  4921  182  4924 0

c  1-1 --> 0
c    (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0 ∧ -p_182) -> (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧ -b^{2, 92}_0)
c  in CNF:
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_2
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_1
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_0
c  in DIMACS:
 4919  4920 -4921  182 -4922 0
 4919  4920 -4921  182 -4923 0
 4919  4920 -4921  182 -4924 0

c  0-1 --> -1
c    (-b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧ -p_182) -> ( b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0)
c  in CNF:
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨  b^{2, 92}_2
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_1
c     b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨  b^{2, 92}_0
c  in DIMACS:
 4919  4920  4921  182  4922 0
 4919  4920  4921  182 -4923 0
 4919  4920  4921  182  4924 0

c  -1-1 --> -2
c    ( b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧  b^{2, 91}_0 ∧ -p_182) -> ( b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0)
c  in CNF:
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨  b^{2, 92}_2
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨  b^{2, 92}_1
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨  p_182 ∨ -b^{2, 92}_0
c  in DIMACS:
-4919  4920 -4921  182  4922 0
-4919  4920 -4921  182  4923 0
-4919  4920 -4921  182 -4924 0

c  -2-1 --> break 
c    ( b^{2, 91}_2 ∧  b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨  b^{2, 91}_0 ∨  p_182 ∨ break
c  in DIMACS:
-4919 -4920  4921  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 91}_2 ∧ -b^{2, 91}_1 ∧ -b^{2, 91}_0 ∧ true) 
c  in CNF:
c    -b^{2, 91}_2 ∨  b^{2, 91}_1 ∨  b^{2, 91}_0 ∨ false 
c  in DIMACS:
-4919  4920  4921  0

c  3 does not represent an automaton state.
c    -(-b^{2, 91}_2 ∧  b^{2, 91}_1 ∧  b^{2, 91}_0 ∧ true) 
c  in CNF:
c     b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ false 
c  in DIMACS:
 4919 -4920 -4921  0
c  -3 does not represent an automaton state.
c    -( b^{2, 91}_2 ∧  b^{2, 91}_1 ∧  b^{2, 91}_0 ∧ true) 
c  in CNF:
c    -b^{2, 91}_2 ∨ -b^{2, 91}_1 ∨ -b^{2, 91}_0 ∨ false 
c  in DIMACS:
-4919 -4920 -4921  0

c i = 92
c  -2+1 --> -1
c    ( b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧  p_184) -> ( b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0)
c  in CNF:
c    -b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨  b^{2, 93}_2
c    -b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_1
c    -b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨  b^{2, 93}_0
c  in DIMACS:
-4922 -4923  4924 -184  4925 0
-4922 -4923  4924 -184 -4926 0
-4922 -4923  4924 -184  4927 0

c  -1+1 --> 0
c    ( b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0 ∧  p_184) -> (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧ -b^{2, 93}_0)
c  in CNF:
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_2
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_1
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_0
c  in DIMACS:
-4922  4923 -4924 -184 -4925 0
-4922  4923 -4924 -184 -4926 0
-4922  4923 -4924 -184 -4927 0

c  0+1 --> 1
c    (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧  p_184) -> (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0)
c  in CNF:
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_2
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_1
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨  b^{2, 93}_0
c  in DIMACS:
 4922  4923  4924 -184 -4925 0
 4922  4923  4924 -184 -4926 0
 4922  4923  4924 -184  4927 0

c  1+1 --> 2
c    (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0 ∧  p_184) -> (-b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0)
c  in CNF:
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_2
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨  b^{2, 93}_1
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ -p_184 ∨ -b^{2, 93}_0
c  in DIMACS:
 4922  4923 -4924 -184 -4925 0
 4922  4923 -4924 -184  4926 0
 4922  4923 -4924 -184 -4927 0

c  2+1 --> break 
c    (-b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧  p_184) -> break
c  in CNF:
c     b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 4922 -4923  4924 -184 1162 0


c  2-1 --> 1
c    (-b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧ -p_184) -> (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0)
c  in CNF:
c     b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_2
c     b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_1
c     b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨  b^{2, 93}_0
c  in DIMACS:
 4922 -4923  4924  184 -4925 0
 4922 -4923  4924  184 -4926 0
 4922 -4923  4924  184  4927 0

c  1-1 --> 0
c    (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0 ∧ -p_184) -> (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧ -b^{2, 93}_0)
c  in CNF:
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_2
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_1
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_0
c  in DIMACS:
 4922  4923 -4924  184 -4925 0
 4922  4923 -4924  184 -4926 0
 4922  4923 -4924  184 -4927 0

c  0-1 --> -1
c    (-b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧ -p_184) -> ( b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0)
c  in CNF:
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨  b^{2, 93}_2
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_1
c     b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨  b^{2, 93}_0
c  in DIMACS:
 4922  4923  4924  184  4925 0
 4922  4923  4924  184 -4926 0
 4922  4923  4924  184  4927 0

c  -1-1 --> -2
c    ( b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧  b^{2, 92}_0 ∧ -p_184) -> ( b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0)
c  in CNF:
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨  b^{2, 93}_2
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨  b^{2, 93}_1
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨  p_184 ∨ -b^{2, 93}_0
c  in DIMACS:
-4922  4923 -4924  184  4925 0
-4922  4923 -4924  184  4926 0
-4922  4923 -4924  184 -4927 0

c  -2-1 --> break 
c    ( b^{2, 92}_2 ∧  b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨  b^{2, 92}_0 ∨  p_184 ∨ break
c  in DIMACS:
-4922 -4923  4924  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 92}_2 ∧ -b^{2, 92}_1 ∧ -b^{2, 92}_0 ∧ true) 
c  in CNF:
c    -b^{2, 92}_2 ∨  b^{2, 92}_1 ∨  b^{2, 92}_0 ∨ false 
c  in DIMACS:
-4922  4923  4924  0

c  3 does not represent an automaton state.
c    -(-b^{2, 92}_2 ∧  b^{2, 92}_1 ∧  b^{2, 92}_0 ∧ true) 
c  in CNF:
c     b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ false 
c  in DIMACS:
 4922 -4923 -4924  0
c  -3 does not represent an automaton state.
c    -( b^{2, 92}_2 ∧  b^{2, 92}_1 ∧  b^{2, 92}_0 ∧ true) 
c  in CNF:
c    -b^{2, 92}_2 ∨ -b^{2, 92}_1 ∨ -b^{2, 92}_0 ∨ false 
c  in DIMACS:
-4922 -4923 -4924  0

c i = 93
c  -2+1 --> -1
c    ( b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧  p_186) -> ( b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0)
c  in CNF:
c    -b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨  b^{2, 94}_2
c    -b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_1
c    -b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨  b^{2, 94}_0
c  in DIMACS:
-4925 -4926  4927 -186  4928 0
-4925 -4926  4927 -186 -4929 0
-4925 -4926  4927 -186  4930 0

c  -1+1 --> 0
c    ( b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0 ∧  p_186) -> (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧ -b^{2, 94}_0)
c  in CNF:
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_2
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_1
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_0
c  in DIMACS:
-4925  4926 -4927 -186 -4928 0
-4925  4926 -4927 -186 -4929 0
-4925  4926 -4927 -186 -4930 0

c  0+1 --> 1
c    (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧  p_186) -> (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0)
c  in CNF:
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_2
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_1
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨  b^{2, 94}_0
c  in DIMACS:
 4925  4926  4927 -186 -4928 0
 4925  4926  4927 -186 -4929 0
 4925  4926  4927 -186  4930 0

c  1+1 --> 2
c    (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0 ∧  p_186) -> (-b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0)
c  in CNF:
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_2
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨  b^{2, 94}_1
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ -p_186 ∨ -b^{2, 94}_0
c  in DIMACS:
 4925  4926 -4927 -186 -4928 0
 4925  4926 -4927 -186  4929 0
 4925  4926 -4927 -186 -4930 0

c  2+1 --> break 
c    (-b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧  p_186) -> break
c  in CNF:
c     b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 4925 -4926  4927 -186 1162 0


c  2-1 --> 1
c    (-b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧ -p_186) -> (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0)
c  in CNF:
c     b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_2
c     b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_1
c     b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨  b^{2, 94}_0
c  in DIMACS:
 4925 -4926  4927  186 -4928 0
 4925 -4926  4927  186 -4929 0
 4925 -4926  4927  186  4930 0

c  1-1 --> 0
c    (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0 ∧ -p_186) -> (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧ -b^{2, 94}_0)
c  in CNF:
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_2
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_1
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_0
c  in DIMACS:
 4925  4926 -4927  186 -4928 0
 4925  4926 -4927  186 -4929 0
 4925  4926 -4927  186 -4930 0

c  0-1 --> -1
c    (-b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧ -p_186) -> ( b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0)
c  in CNF:
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨  b^{2, 94}_2
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_1
c     b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨  b^{2, 94}_0
c  in DIMACS:
 4925  4926  4927  186  4928 0
 4925  4926  4927  186 -4929 0
 4925  4926  4927  186  4930 0

c  -1-1 --> -2
c    ( b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧  b^{2, 93}_0 ∧ -p_186) -> ( b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0)
c  in CNF:
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨  b^{2, 94}_2
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨  b^{2, 94}_1
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨  p_186 ∨ -b^{2, 94}_0
c  in DIMACS:
-4925  4926 -4927  186  4928 0
-4925  4926 -4927  186  4929 0
-4925  4926 -4927  186 -4930 0

c  -2-1 --> break 
c    ( b^{2, 93}_2 ∧  b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨  b^{2, 93}_0 ∨  p_186 ∨ break
c  in DIMACS:
-4925 -4926  4927  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 93}_2 ∧ -b^{2, 93}_1 ∧ -b^{2, 93}_0 ∧ true) 
c  in CNF:
c    -b^{2, 93}_2 ∨  b^{2, 93}_1 ∨  b^{2, 93}_0 ∨ false 
c  in DIMACS:
-4925  4926  4927  0

c  3 does not represent an automaton state.
c    -(-b^{2, 93}_2 ∧  b^{2, 93}_1 ∧  b^{2, 93}_0 ∧ true) 
c  in CNF:
c     b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ false 
c  in DIMACS:
 4925 -4926 -4927  0
c  -3 does not represent an automaton state.
c    -( b^{2, 93}_2 ∧  b^{2, 93}_1 ∧  b^{2, 93}_0 ∧ true) 
c  in CNF:
c    -b^{2, 93}_2 ∨ -b^{2, 93}_1 ∨ -b^{2, 93}_0 ∨ false 
c  in DIMACS:
-4925 -4926 -4927  0

c i = 94
c  -2+1 --> -1
c    ( b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧  p_188) -> ( b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0)
c  in CNF:
c    -b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨  b^{2, 95}_2
c    -b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_1
c    -b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨  b^{2, 95}_0
c  in DIMACS:
-4928 -4929  4930 -188  4931 0
-4928 -4929  4930 -188 -4932 0
-4928 -4929  4930 -188  4933 0

c  -1+1 --> 0
c    ( b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0 ∧  p_188) -> (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧ -b^{2, 95}_0)
c  in CNF:
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_2
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_1
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_0
c  in DIMACS:
-4928  4929 -4930 -188 -4931 0
-4928  4929 -4930 -188 -4932 0
-4928  4929 -4930 -188 -4933 0

c  0+1 --> 1
c    (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧  p_188) -> (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0)
c  in CNF:
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_2
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_1
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨  b^{2, 95}_0
c  in DIMACS:
 4928  4929  4930 -188 -4931 0
 4928  4929  4930 -188 -4932 0
 4928  4929  4930 -188  4933 0

c  1+1 --> 2
c    (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0 ∧  p_188) -> (-b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0)
c  in CNF:
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_2
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨  b^{2, 95}_1
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ -p_188 ∨ -b^{2, 95}_0
c  in DIMACS:
 4928  4929 -4930 -188 -4931 0
 4928  4929 -4930 -188  4932 0
 4928  4929 -4930 -188 -4933 0

c  2+1 --> break 
c    (-b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧  p_188) -> break
c  in CNF:
c     b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 4928 -4929  4930 -188 1162 0


c  2-1 --> 1
c    (-b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧ -p_188) -> (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0)
c  in CNF:
c     b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_2
c     b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_1
c     b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨  b^{2, 95}_0
c  in DIMACS:
 4928 -4929  4930  188 -4931 0
 4928 -4929  4930  188 -4932 0
 4928 -4929  4930  188  4933 0

c  1-1 --> 0
c    (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0 ∧ -p_188) -> (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧ -b^{2, 95}_0)
c  in CNF:
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_2
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_1
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_0
c  in DIMACS:
 4928  4929 -4930  188 -4931 0
 4928  4929 -4930  188 -4932 0
 4928  4929 -4930  188 -4933 0

c  0-1 --> -1
c    (-b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧ -p_188) -> ( b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0)
c  in CNF:
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨  b^{2, 95}_2
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_1
c     b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨  b^{2, 95}_0
c  in DIMACS:
 4928  4929  4930  188  4931 0
 4928  4929  4930  188 -4932 0
 4928  4929  4930  188  4933 0

c  -1-1 --> -2
c    ( b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧  b^{2, 94}_0 ∧ -p_188) -> ( b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0)
c  in CNF:
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨  b^{2, 95}_2
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨  b^{2, 95}_1
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨  p_188 ∨ -b^{2, 95}_0
c  in DIMACS:
-4928  4929 -4930  188  4931 0
-4928  4929 -4930  188  4932 0
-4928  4929 -4930  188 -4933 0

c  -2-1 --> break 
c    ( b^{2, 94}_2 ∧  b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨  b^{2, 94}_0 ∨  p_188 ∨ break
c  in DIMACS:
-4928 -4929  4930  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 94}_2 ∧ -b^{2, 94}_1 ∧ -b^{2, 94}_0 ∧ true) 
c  in CNF:
c    -b^{2, 94}_2 ∨  b^{2, 94}_1 ∨  b^{2, 94}_0 ∨ false 
c  in DIMACS:
-4928  4929  4930  0

c  3 does not represent an automaton state.
c    -(-b^{2, 94}_2 ∧  b^{2, 94}_1 ∧  b^{2, 94}_0 ∧ true) 
c  in CNF:
c     b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ false 
c  in DIMACS:
 4928 -4929 -4930  0
c  -3 does not represent an automaton state.
c    -( b^{2, 94}_2 ∧  b^{2, 94}_1 ∧  b^{2, 94}_0 ∧ true) 
c  in CNF:
c    -b^{2, 94}_2 ∨ -b^{2, 94}_1 ∨ -b^{2, 94}_0 ∨ false 
c  in DIMACS:
-4928 -4929 -4930  0

c i = 95
c  -2+1 --> -1
c    ( b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧  p_190) -> ( b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0)
c  in CNF:
c    -b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨  b^{2, 96}_2
c    -b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_1
c    -b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨  b^{2, 96}_0
c  in DIMACS:
-4931 -4932  4933 -190  4934 0
-4931 -4932  4933 -190 -4935 0
-4931 -4932  4933 -190  4936 0

c  -1+1 --> 0
c    ( b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0 ∧  p_190) -> (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧ -b^{2, 96}_0)
c  in CNF:
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_2
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_1
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_0
c  in DIMACS:
-4931  4932 -4933 -190 -4934 0
-4931  4932 -4933 -190 -4935 0
-4931  4932 -4933 -190 -4936 0

c  0+1 --> 1
c    (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧  p_190) -> (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0)
c  in CNF:
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_2
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_1
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨  b^{2, 96}_0
c  in DIMACS:
 4931  4932  4933 -190 -4934 0
 4931  4932  4933 -190 -4935 0
 4931  4932  4933 -190  4936 0

c  1+1 --> 2
c    (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0 ∧  p_190) -> (-b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0)
c  in CNF:
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_2
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨  b^{2, 96}_1
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ -p_190 ∨ -b^{2, 96}_0
c  in DIMACS:
 4931  4932 -4933 -190 -4934 0
 4931  4932 -4933 -190  4935 0
 4931  4932 -4933 -190 -4936 0

c  2+1 --> break 
c    (-b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧  p_190) -> break
c  in CNF:
c     b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 4931 -4932  4933 -190 1162 0


c  2-1 --> 1
c    (-b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧ -p_190) -> (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0)
c  in CNF:
c     b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_2
c     b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_1
c     b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨  b^{2, 96}_0
c  in DIMACS:
 4931 -4932  4933  190 -4934 0
 4931 -4932  4933  190 -4935 0
 4931 -4932  4933  190  4936 0

c  1-1 --> 0
c    (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0 ∧ -p_190) -> (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧ -b^{2, 96}_0)
c  in CNF:
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_2
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_1
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_0
c  in DIMACS:
 4931  4932 -4933  190 -4934 0
 4931  4932 -4933  190 -4935 0
 4931  4932 -4933  190 -4936 0

c  0-1 --> -1
c    (-b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧ -p_190) -> ( b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0)
c  in CNF:
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨  b^{2, 96}_2
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_1
c     b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨  b^{2, 96}_0
c  in DIMACS:
 4931  4932  4933  190  4934 0
 4931  4932  4933  190 -4935 0
 4931  4932  4933  190  4936 0

c  -1-1 --> -2
c    ( b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧  b^{2, 95}_0 ∧ -p_190) -> ( b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0)
c  in CNF:
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨  b^{2, 96}_2
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨  b^{2, 96}_1
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨  p_190 ∨ -b^{2, 96}_0
c  in DIMACS:
-4931  4932 -4933  190  4934 0
-4931  4932 -4933  190  4935 0
-4931  4932 -4933  190 -4936 0

c  -2-1 --> break 
c    ( b^{2, 95}_2 ∧  b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨  b^{2, 95}_0 ∨  p_190 ∨ break
c  in DIMACS:
-4931 -4932  4933  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 95}_2 ∧ -b^{2, 95}_1 ∧ -b^{2, 95}_0 ∧ true) 
c  in CNF:
c    -b^{2, 95}_2 ∨  b^{2, 95}_1 ∨  b^{2, 95}_0 ∨ false 
c  in DIMACS:
-4931  4932  4933  0

c  3 does not represent an automaton state.
c    -(-b^{2, 95}_2 ∧  b^{2, 95}_1 ∧  b^{2, 95}_0 ∧ true) 
c  in CNF:
c     b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ false 
c  in DIMACS:
 4931 -4932 -4933  0
c  -3 does not represent an automaton state.
c    -( b^{2, 95}_2 ∧  b^{2, 95}_1 ∧  b^{2, 95}_0 ∧ true) 
c  in CNF:
c    -b^{2, 95}_2 ∨ -b^{2, 95}_1 ∨ -b^{2, 95}_0 ∨ false 
c  in DIMACS:
-4931 -4932 -4933  0

c i = 96
c  -2+1 --> -1
c    ( b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧  p_192) -> ( b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0)
c  in CNF:
c    -b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨  b^{2, 97}_2
c    -b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_1
c    -b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨  b^{2, 97}_0
c  in DIMACS:
-4934 -4935  4936 -192  4937 0
-4934 -4935  4936 -192 -4938 0
-4934 -4935  4936 -192  4939 0

c  -1+1 --> 0
c    ( b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0 ∧  p_192) -> (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧ -b^{2, 97}_0)
c  in CNF:
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_2
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_1
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_0
c  in DIMACS:
-4934  4935 -4936 -192 -4937 0
-4934  4935 -4936 -192 -4938 0
-4934  4935 -4936 -192 -4939 0

c  0+1 --> 1
c    (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧  p_192) -> (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0)
c  in CNF:
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_2
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_1
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨  b^{2, 97}_0
c  in DIMACS:
 4934  4935  4936 -192 -4937 0
 4934  4935  4936 -192 -4938 0
 4934  4935  4936 -192  4939 0

c  1+1 --> 2
c    (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0 ∧  p_192) -> (-b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0)
c  in CNF:
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_2
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨  b^{2, 97}_1
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ -p_192 ∨ -b^{2, 97}_0
c  in DIMACS:
 4934  4935 -4936 -192 -4937 0
 4934  4935 -4936 -192  4938 0
 4934  4935 -4936 -192 -4939 0

c  2+1 --> break 
c    (-b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧  p_192) -> break
c  in CNF:
c     b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 4934 -4935  4936 -192 1162 0


c  2-1 --> 1
c    (-b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧ -p_192) -> (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0)
c  in CNF:
c     b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_2
c     b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_1
c     b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨  b^{2, 97}_0
c  in DIMACS:
 4934 -4935  4936  192 -4937 0
 4934 -4935  4936  192 -4938 0
 4934 -4935  4936  192  4939 0

c  1-1 --> 0
c    (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0 ∧ -p_192) -> (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧ -b^{2, 97}_0)
c  in CNF:
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_2
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_1
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_0
c  in DIMACS:
 4934  4935 -4936  192 -4937 0
 4934  4935 -4936  192 -4938 0
 4934  4935 -4936  192 -4939 0

c  0-1 --> -1
c    (-b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧ -p_192) -> ( b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0)
c  in CNF:
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨  b^{2, 97}_2
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_1
c     b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨  b^{2, 97}_0
c  in DIMACS:
 4934  4935  4936  192  4937 0
 4934  4935  4936  192 -4938 0
 4934  4935  4936  192  4939 0

c  -1-1 --> -2
c    ( b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧  b^{2, 96}_0 ∧ -p_192) -> ( b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0)
c  in CNF:
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨  b^{2, 97}_2
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨  b^{2, 97}_1
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨  p_192 ∨ -b^{2, 97}_0
c  in DIMACS:
-4934  4935 -4936  192  4937 0
-4934  4935 -4936  192  4938 0
-4934  4935 -4936  192 -4939 0

c  -2-1 --> break 
c    ( b^{2, 96}_2 ∧  b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨  b^{2, 96}_0 ∨  p_192 ∨ break
c  in DIMACS:
-4934 -4935  4936  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 96}_2 ∧ -b^{2, 96}_1 ∧ -b^{2, 96}_0 ∧ true) 
c  in CNF:
c    -b^{2, 96}_2 ∨  b^{2, 96}_1 ∨  b^{2, 96}_0 ∨ false 
c  in DIMACS:
-4934  4935  4936  0

c  3 does not represent an automaton state.
c    -(-b^{2, 96}_2 ∧  b^{2, 96}_1 ∧  b^{2, 96}_0 ∧ true) 
c  in CNF:
c     b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ false 
c  in DIMACS:
 4934 -4935 -4936  0
c  -3 does not represent an automaton state.
c    -( b^{2, 96}_2 ∧  b^{2, 96}_1 ∧  b^{2, 96}_0 ∧ true) 
c  in CNF:
c    -b^{2, 96}_2 ∨ -b^{2, 96}_1 ∨ -b^{2, 96}_0 ∨ false 
c  in DIMACS:
-4934 -4935 -4936  0

c i = 97
c  -2+1 --> -1
c    ( b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧  p_194) -> ( b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0)
c  in CNF:
c    -b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨  b^{2, 98}_2
c    -b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_1
c    -b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨  b^{2, 98}_0
c  in DIMACS:
-4937 -4938  4939 -194  4940 0
-4937 -4938  4939 -194 -4941 0
-4937 -4938  4939 -194  4942 0

c  -1+1 --> 0
c    ( b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0 ∧  p_194) -> (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧ -b^{2, 98}_0)
c  in CNF:
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_2
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_1
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_0
c  in DIMACS:
-4937  4938 -4939 -194 -4940 0
-4937  4938 -4939 -194 -4941 0
-4937  4938 -4939 -194 -4942 0

c  0+1 --> 1
c    (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧  p_194) -> (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0)
c  in CNF:
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_2
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_1
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨  b^{2, 98}_0
c  in DIMACS:
 4937  4938  4939 -194 -4940 0
 4937  4938  4939 -194 -4941 0
 4937  4938  4939 -194  4942 0

c  1+1 --> 2
c    (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0 ∧  p_194) -> (-b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0)
c  in CNF:
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_2
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨  b^{2, 98}_1
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ -p_194 ∨ -b^{2, 98}_0
c  in DIMACS:
 4937  4938 -4939 -194 -4940 0
 4937  4938 -4939 -194  4941 0
 4937  4938 -4939 -194 -4942 0

c  2+1 --> break 
c    (-b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧  p_194) -> break
c  in CNF:
c     b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ -p_194 ∨ break
c  in DIMACS:
 4937 -4938  4939 -194 1162 0


c  2-1 --> 1
c    (-b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧ -p_194) -> (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0)
c  in CNF:
c     b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_2
c     b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_1
c     b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨  b^{2, 98}_0
c  in DIMACS:
 4937 -4938  4939  194 -4940 0
 4937 -4938  4939  194 -4941 0
 4937 -4938  4939  194  4942 0

c  1-1 --> 0
c    (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0 ∧ -p_194) -> (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧ -b^{2, 98}_0)
c  in CNF:
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_2
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_1
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_0
c  in DIMACS:
 4937  4938 -4939  194 -4940 0
 4937  4938 -4939  194 -4941 0
 4937  4938 -4939  194 -4942 0

c  0-1 --> -1
c    (-b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧ -p_194) -> ( b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0)
c  in CNF:
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨  b^{2, 98}_2
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_1
c     b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨  b^{2, 98}_0
c  in DIMACS:
 4937  4938  4939  194  4940 0
 4937  4938  4939  194 -4941 0
 4937  4938  4939  194  4942 0

c  -1-1 --> -2
c    ( b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧  b^{2, 97}_0 ∧ -p_194) -> ( b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0)
c  in CNF:
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨  b^{2, 98}_2
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨  b^{2, 98}_1
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨  p_194 ∨ -b^{2, 98}_0
c  in DIMACS:
-4937  4938 -4939  194  4940 0
-4937  4938 -4939  194  4941 0
-4937  4938 -4939  194 -4942 0

c  -2-1 --> break 
c    ( b^{2, 97}_2 ∧  b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧ -p_194) -> break
c  in CNF:
c    -b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨  b^{2, 97}_0 ∨  p_194 ∨ break
c  in DIMACS:
-4937 -4938  4939  194 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 97}_2 ∧ -b^{2, 97}_1 ∧ -b^{2, 97}_0 ∧ true) 
c  in CNF:
c    -b^{2, 97}_2 ∨  b^{2, 97}_1 ∨  b^{2, 97}_0 ∨ false 
c  in DIMACS:
-4937  4938  4939  0

c  3 does not represent an automaton state.
c    -(-b^{2, 97}_2 ∧  b^{2, 97}_1 ∧  b^{2, 97}_0 ∧ true) 
c  in CNF:
c     b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ false 
c  in DIMACS:
 4937 -4938 -4939  0
c  -3 does not represent an automaton state.
c    -( b^{2, 97}_2 ∧  b^{2, 97}_1 ∧  b^{2, 97}_0 ∧ true) 
c  in CNF:
c    -b^{2, 97}_2 ∨ -b^{2, 97}_1 ∨ -b^{2, 97}_0 ∨ false 
c  in DIMACS:
-4937 -4938 -4939  0

c i = 98
c  -2+1 --> -1
c    ( b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧  p_196) -> ( b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0)
c  in CNF:
c    -b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨  b^{2, 99}_2
c    -b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_1
c    -b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨  b^{2, 99}_0
c  in DIMACS:
-4940 -4941  4942 -196  4943 0
-4940 -4941  4942 -196 -4944 0
-4940 -4941  4942 -196  4945 0

c  -1+1 --> 0
c    ( b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0 ∧  p_196) -> (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧ -b^{2, 99}_0)
c  in CNF:
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_2
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_1
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_0
c  in DIMACS:
-4940  4941 -4942 -196 -4943 0
-4940  4941 -4942 -196 -4944 0
-4940  4941 -4942 -196 -4945 0

c  0+1 --> 1
c    (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧  p_196) -> (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0)
c  in CNF:
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_2
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_1
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨  b^{2, 99}_0
c  in DIMACS:
 4940  4941  4942 -196 -4943 0
 4940  4941  4942 -196 -4944 0
 4940  4941  4942 -196  4945 0

c  1+1 --> 2
c    (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0 ∧  p_196) -> (-b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0)
c  in CNF:
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_2
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨  b^{2, 99}_1
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ -p_196 ∨ -b^{2, 99}_0
c  in DIMACS:
 4940  4941 -4942 -196 -4943 0
 4940  4941 -4942 -196  4944 0
 4940  4941 -4942 -196 -4945 0

c  2+1 --> break 
c    (-b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧  p_196) -> break
c  in CNF:
c     b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 4940 -4941  4942 -196 1162 0


c  2-1 --> 1
c    (-b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧ -p_196) -> (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0)
c  in CNF:
c     b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_2
c     b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_1
c     b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨  b^{2, 99}_0
c  in DIMACS:
 4940 -4941  4942  196 -4943 0
 4940 -4941  4942  196 -4944 0
 4940 -4941  4942  196  4945 0

c  1-1 --> 0
c    (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0 ∧ -p_196) -> (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧ -b^{2, 99}_0)
c  in CNF:
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_2
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_1
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_0
c  in DIMACS:
 4940  4941 -4942  196 -4943 0
 4940  4941 -4942  196 -4944 0
 4940  4941 -4942  196 -4945 0

c  0-1 --> -1
c    (-b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧ -p_196) -> ( b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0)
c  in CNF:
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨  b^{2, 99}_2
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_1
c     b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨  b^{2, 99}_0
c  in DIMACS:
 4940  4941  4942  196  4943 0
 4940  4941  4942  196 -4944 0
 4940  4941  4942  196  4945 0

c  -1-1 --> -2
c    ( b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧  b^{2, 98}_0 ∧ -p_196) -> ( b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0)
c  in CNF:
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨  b^{2, 99}_2
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨  b^{2, 99}_1
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨  p_196 ∨ -b^{2, 99}_0
c  in DIMACS:
-4940  4941 -4942  196  4943 0
-4940  4941 -4942  196  4944 0
-4940  4941 -4942  196 -4945 0

c  -2-1 --> break 
c    ( b^{2, 98}_2 ∧  b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨  b^{2, 98}_0 ∨  p_196 ∨ break
c  in DIMACS:
-4940 -4941  4942  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 98}_2 ∧ -b^{2, 98}_1 ∧ -b^{2, 98}_0 ∧ true) 
c  in CNF:
c    -b^{2, 98}_2 ∨  b^{2, 98}_1 ∨  b^{2, 98}_0 ∨ false 
c  in DIMACS:
-4940  4941  4942  0

c  3 does not represent an automaton state.
c    -(-b^{2, 98}_2 ∧  b^{2, 98}_1 ∧  b^{2, 98}_0 ∧ true) 
c  in CNF:
c     b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ false 
c  in DIMACS:
 4940 -4941 -4942  0
c  -3 does not represent an automaton state.
c    -( b^{2, 98}_2 ∧  b^{2, 98}_1 ∧  b^{2, 98}_0 ∧ true) 
c  in CNF:
c    -b^{2, 98}_2 ∨ -b^{2, 98}_1 ∨ -b^{2, 98}_0 ∨ false 
c  in DIMACS:
-4940 -4941 -4942  0

c i = 99
c  -2+1 --> -1
c    ( b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧  p_198) -> ( b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0)
c  in CNF:
c    -b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨  b^{2, 100}_2
c    -b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_1
c    -b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨  b^{2, 100}_0
c  in DIMACS:
-4943 -4944  4945 -198  4946 0
-4943 -4944  4945 -198 -4947 0
-4943 -4944  4945 -198  4948 0

c  -1+1 --> 0
c    ( b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0 ∧  p_198) -> (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧ -b^{2, 100}_0)
c  in CNF:
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_2
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_1
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_0
c  in DIMACS:
-4943  4944 -4945 -198 -4946 0
-4943  4944 -4945 -198 -4947 0
-4943  4944 -4945 -198 -4948 0

c  0+1 --> 1
c    (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧  p_198) -> (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0)
c  in CNF:
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_2
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_1
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨  b^{2, 100}_0
c  in DIMACS:
 4943  4944  4945 -198 -4946 0
 4943  4944  4945 -198 -4947 0
 4943  4944  4945 -198  4948 0

c  1+1 --> 2
c    (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0 ∧  p_198) -> (-b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0)
c  in CNF:
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_2
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨  b^{2, 100}_1
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ -p_198 ∨ -b^{2, 100}_0
c  in DIMACS:
 4943  4944 -4945 -198 -4946 0
 4943  4944 -4945 -198  4947 0
 4943  4944 -4945 -198 -4948 0

c  2+1 --> break 
c    (-b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧  p_198) -> break
c  in CNF:
c     b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 4943 -4944  4945 -198 1162 0


c  2-1 --> 1
c    (-b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧ -p_198) -> (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0)
c  in CNF:
c     b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_2
c     b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_1
c     b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨  b^{2, 100}_0
c  in DIMACS:
 4943 -4944  4945  198 -4946 0
 4943 -4944  4945  198 -4947 0
 4943 -4944  4945  198  4948 0

c  1-1 --> 0
c    (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0 ∧ -p_198) -> (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧ -b^{2, 100}_0)
c  in CNF:
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_2
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_1
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_0
c  in DIMACS:
 4943  4944 -4945  198 -4946 0
 4943  4944 -4945  198 -4947 0
 4943  4944 -4945  198 -4948 0

c  0-1 --> -1
c    (-b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧ -p_198) -> ( b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0)
c  in CNF:
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨  b^{2, 100}_2
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_1
c     b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨  b^{2, 100}_0
c  in DIMACS:
 4943  4944  4945  198  4946 0
 4943  4944  4945  198 -4947 0
 4943  4944  4945  198  4948 0

c  -1-1 --> -2
c    ( b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧  b^{2, 99}_0 ∧ -p_198) -> ( b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0)
c  in CNF:
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨  b^{2, 100}_2
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨  b^{2, 100}_1
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨  p_198 ∨ -b^{2, 100}_0
c  in DIMACS:
-4943  4944 -4945  198  4946 0
-4943  4944 -4945  198  4947 0
-4943  4944 -4945  198 -4948 0

c  -2-1 --> break 
c    ( b^{2, 99}_2 ∧  b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨  b^{2, 99}_0 ∨  p_198 ∨ break
c  in DIMACS:
-4943 -4944  4945  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 99}_2 ∧ -b^{2, 99}_1 ∧ -b^{2, 99}_0 ∧ true) 
c  in CNF:
c    -b^{2, 99}_2 ∨  b^{2, 99}_1 ∨  b^{2, 99}_0 ∨ false 
c  in DIMACS:
-4943  4944  4945  0

c  3 does not represent an automaton state.
c    -(-b^{2, 99}_2 ∧  b^{2, 99}_1 ∧  b^{2, 99}_0 ∧ true) 
c  in CNF:
c     b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ false 
c  in DIMACS:
 4943 -4944 -4945  0
c  -3 does not represent an automaton state.
c    -( b^{2, 99}_2 ∧  b^{2, 99}_1 ∧  b^{2, 99}_0 ∧ true) 
c  in CNF:
c    -b^{2, 99}_2 ∨ -b^{2, 99}_1 ∨ -b^{2, 99}_0 ∨ false 
c  in DIMACS:
-4943 -4944 -4945  0

c i = 100
c  -2+1 --> -1
c    ( b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧  p_200) -> ( b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0)
c  in CNF:
c    -b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨  b^{2, 101}_2
c    -b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_1
c    -b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨  b^{2, 101}_0
c  in DIMACS:
-4946 -4947  4948 -200  4949 0
-4946 -4947  4948 -200 -4950 0
-4946 -4947  4948 -200  4951 0

c  -1+1 --> 0
c    ( b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0 ∧  p_200) -> (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧ -b^{2, 101}_0)
c  in CNF:
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_2
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_1
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_0
c  in DIMACS:
-4946  4947 -4948 -200 -4949 0
-4946  4947 -4948 -200 -4950 0
-4946  4947 -4948 -200 -4951 0

c  0+1 --> 1
c    (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧  p_200) -> (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0)
c  in CNF:
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_2
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_1
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨  b^{2, 101}_0
c  in DIMACS:
 4946  4947  4948 -200 -4949 0
 4946  4947  4948 -200 -4950 0
 4946  4947  4948 -200  4951 0

c  1+1 --> 2
c    (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0 ∧  p_200) -> (-b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0)
c  in CNF:
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_2
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨  b^{2, 101}_1
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ -p_200 ∨ -b^{2, 101}_0
c  in DIMACS:
 4946  4947 -4948 -200 -4949 0
 4946  4947 -4948 -200  4950 0
 4946  4947 -4948 -200 -4951 0

c  2+1 --> break 
c    (-b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧  p_200) -> break
c  in CNF:
c     b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 4946 -4947  4948 -200 1162 0


c  2-1 --> 1
c    (-b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧ -p_200) -> (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0)
c  in CNF:
c     b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_2
c     b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_1
c     b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨  b^{2, 101}_0
c  in DIMACS:
 4946 -4947  4948  200 -4949 0
 4946 -4947  4948  200 -4950 0
 4946 -4947  4948  200  4951 0

c  1-1 --> 0
c    (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0 ∧ -p_200) -> (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧ -b^{2, 101}_0)
c  in CNF:
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_2
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_1
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_0
c  in DIMACS:
 4946  4947 -4948  200 -4949 0
 4946  4947 -4948  200 -4950 0
 4946  4947 -4948  200 -4951 0

c  0-1 --> -1
c    (-b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧ -p_200) -> ( b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0)
c  in CNF:
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨  b^{2, 101}_2
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_1
c     b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨  b^{2, 101}_0
c  in DIMACS:
 4946  4947  4948  200  4949 0
 4946  4947  4948  200 -4950 0
 4946  4947  4948  200  4951 0

c  -1-1 --> -2
c    ( b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧  b^{2, 100}_0 ∧ -p_200) -> ( b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0)
c  in CNF:
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨  b^{2, 101}_2
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨  b^{2, 101}_1
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨  p_200 ∨ -b^{2, 101}_0
c  in DIMACS:
-4946  4947 -4948  200  4949 0
-4946  4947 -4948  200  4950 0
-4946  4947 -4948  200 -4951 0

c  -2-1 --> break 
c    ( b^{2, 100}_2 ∧  b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨  b^{2, 100}_0 ∨  p_200 ∨ break
c  in DIMACS:
-4946 -4947  4948  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 100}_2 ∧ -b^{2, 100}_1 ∧ -b^{2, 100}_0 ∧ true) 
c  in CNF:
c    -b^{2, 100}_2 ∨  b^{2, 100}_1 ∨  b^{2, 100}_0 ∨ false 
c  in DIMACS:
-4946  4947  4948  0

c  3 does not represent an automaton state.
c    -(-b^{2, 100}_2 ∧  b^{2, 100}_1 ∧  b^{2, 100}_0 ∧ true) 
c  in CNF:
c     b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ false 
c  in DIMACS:
 4946 -4947 -4948  0
c  -3 does not represent an automaton state.
c    -( b^{2, 100}_2 ∧  b^{2, 100}_1 ∧  b^{2, 100}_0 ∧ true) 
c  in CNF:
c    -b^{2, 100}_2 ∨ -b^{2, 100}_1 ∨ -b^{2, 100}_0 ∨ false 
c  in DIMACS:
-4946 -4947 -4948  0

c i = 101
c  -2+1 --> -1
c    ( b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧  p_202) -> ( b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0)
c  in CNF:
c    -b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨  b^{2, 102}_2
c    -b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_1
c    -b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨  b^{2, 102}_0
c  in DIMACS:
-4949 -4950  4951 -202  4952 0
-4949 -4950  4951 -202 -4953 0
-4949 -4950  4951 -202  4954 0

c  -1+1 --> 0
c    ( b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0 ∧  p_202) -> (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧ -b^{2, 102}_0)
c  in CNF:
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_2
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_1
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_0
c  in DIMACS:
-4949  4950 -4951 -202 -4952 0
-4949  4950 -4951 -202 -4953 0
-4949  4950 -4951 -202 -4954 0

c  0+1 --> 1
c    (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧  p_202) -> (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0)
c  in CNF:
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_2
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_1
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨  b^{2, 102}_0
c  in DIMACS:
 4949  4950  4951 -202 -4952 0
 4949  4950  4951 -202 -4953 0
 4949  4950  4951 -202  4954 0

c  1+1 --> 2
c    (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0 ∧  p_202) -> (-b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0)
c  in CNF:
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_2
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨  b^{2, 102}_1
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ -p_202 ∨ -b^{2, 102}_0
c  in DIMACS:
 4949  4950 -4951 -202 -4952 0
 4949  4950 -4951 -202  4953 0
 4949  4950 -4951 -202 -4954 0

c  2+1 --> break 
c    (-b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧  p_202) -> break
c  in CNF:
c     b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ -p_202 ∨ break
c  in DIMACS:
 4949 -4950  4951 -202 1162 0


c  2-1 --> 1
c    (-b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧ -p_202) -> (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0)
c  in CNF:
c     b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_2
c     b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_1
c     b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨  b^{2, 102}_0
c  in DIMACS:
 4949 -4950  4951  202 -4952 0
 4949 -4950  4951  202 -4953 0
 4949 -4950  4951  202  4954 0

c  1-1 --> 0
c    (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0 ∧ -p_202) -> (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧ -b^{2, 102}_0)
c  in CNF:
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_2
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_1
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_0
c  in DIMACS:
 4949  4950 -4951  202 -4952 0
 4949  4950 -4951  202 -4953 0
 4949  4950 -4951  202 -4954 0

c  0-1 --> -1
c    (-b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧ -p_202) -> ( b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0)
c  in CNF:
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨  b^{2, 102}_2
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_1
c     b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨  b^{2, 102}_0
c  in DIMACS:
 4949  4950  4951  202  4952 0
 4949  4950  4951  202 -4953 0
 4949  4950  4951  202  4954 0

c  -1-1 --> -2
c    ( b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧  b^{2, 101}_0 ∧ -p_202) -> ( b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0)
c  in CNF:
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨  b^{2, 102}_2
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨  b^{2, 102}_1
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨  p_202 ∨ -b^{2, 102}_0
c  in DIMACS:
-4949  4950 -4951  202  4952 0
-4949  4950 -4951  202  4953 0
-4949  4950 -4951  202 -4954 0

c  -2-1 --> break 
c    ( b^{2, 101}_2 ∧  b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧ -p_202) -> break
c  in CNF:
c    -b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨  b^{2, 101}_0 ∨  p_202 ∨ break
c  in DIMACS:
-4949 -4950  4951  202 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 101}_2 ∧ -b^{2, 101}_1 ∧ -b^{2, 101}_0 ∧ true) 
c  in CNF:
c    -b^{2, 101}_2 ∨  b^{2, 101}_1 ∨  b^{2, 101}_0 ∨ false 
c  in DIMACS:
-4949  4950  4951  0

c  3 does not represent an automaton state.
c    -(-b^{2, 101}_2 ∧  b^{2, 101}_1 ∧  b^{2, 101}_0 ∧ true) 
c  in CNF:
c     b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ false 
c  in DIMACS:
 4949 -4950 -4951  0
c  -3 does not represent an automaton state.
c    -( b^{2, 101}_2 ∧  b^{2, 101}_1 ∧  b^{2, 101}_0 ∧ true) 
c  in CNF:
c    -b^{2, 101}_2 ∨ -b^{2, 101}_1 ∨ -b^{2, 101}_0 ∨ false 
c  in DIMACS:
-4949 -4950 -4951  0

c i = 102
c  -2+1 --> -1
c    ( b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧  p_204) -> ( b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0)
c  in CNF:
c    -b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨  b^{2, 103}_2
c    -b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_1
c    -b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨  b^{2, 103}_0
c  in DIMACS:
-4952 -4953  4954 -204  4955 0
-4952 -4953  4954 -204 -4956 0
-4952 -4953  4954 -204  4957 0

c  -1+1 --> 0
c    ( b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0 ∧  p_204) -> (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧ -b^{2, 103}_0)
c  in CNF:
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_2
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_1
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_0
c  in DIMACS:
-4952  4953 -4954 -204 -4955 0
-4952  4953 -4954 -204 -4956 0
-4952  4953 -4954 -204 -4957 0

c  0+1 --> 1
c    (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧  p_204) -> (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0)
c  in CNF:
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_2
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_1
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨  b^{2, 103}_0
c  in DIMACS:
 4952  4953  4954 -204 -4955 0
 4952  4953  4954 -204 -4956 0
 4952  4953  4954 -204  4957 0

c  1+1 --> 2
c    (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0 ∧  p_204) -> (-b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0)
c  in CNF:
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_2
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨  b^{2, 103}_1
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ -p_204 ∨ -b^{2, 103}_0
c  in DIMACS:
 4952  4953 -4954 -204 -4955 0
 4952  4953 -4954 -204  4956 0
 4952  4953 -4954 -204 -4957 0

c  2+1 --> break 
c    (-b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧  p_204) -> break
c  in CNF:
c     b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 4952 -4953  4954 -204 1162 0


c  2-1 --> 1
c    (-b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧ -p_204) -> (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0)
c  in CNF:
c     b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_2
c     b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_1
c     b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨  b^{2, 103}_0
c  in DIMACS:
 4952 -4953  4954  204 -4955 0
 4952 -4953  4954  204 -4956 0
 4952 -4953  4954  204  4957 0

c  1-1 --> 0
c    (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0 ∧ -p_204) -> (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧ -b^{2, 103}_0)
c  in CNF:
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_2
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_1
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_0
c  in DIMACS:
 4952  4953 -4954  204 -4955 0
 4952  4953 -4954  204 -4956 0
 4952  4953 -4954  204 -4957 0

c  0-1 --> -1
c    (-b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧ -p_204) -> ( b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0)
c  in CNF:
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨  b^{2, 103}_2
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_1
c     b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨  b^{2, 103}_0
c  in DIMACS:
 4952  4953  4954  204  4955 0
 4952  4953  4954  204 -4956 0
 4952  4953  4954  204  4957 0

c  -1-1 --> -2
c    ( b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧  b^{2, 102}_0 ∧ -p_204) -> ( b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0)
c  in CNF:
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨  b^{2, 103}_2
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨  b^{2, 103}_1
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨  p_204 ∨ -b^{2, 103}_0
c  in DIMACS:
-4952  4953 -4954  204  4955 0
-4952  4953 -4954  204  4956 0
-4952  4953 -4954  204 -4957 0

c  -2-1 --> break 
c    ( b^{2, 102}_2 ∧  b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨  b^{2, 102}_0 ∨  p_204 ∨ break
c  in DIMACS:
-4952 -4953  4954  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 102}_2 ∧ -b^{2, 102}_1 ∧ -b^{2, 102}_0 ∧ true) 
c  in CNF:
c    -b^{2, 102}_2 ∨  b^{2, 102}_1 ∨  b^{2, 102}_0 ∨ false 
c  in DIMACS:
-4952  4953  4954  0

c  3 does not represent an automaton state.
c    -(-b^{2, 102}_2 ∧  b^{2, 102}_1 ∧  b^{2, 102}_0 ∧ true) 
c  in CNF:
c     b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ false 
c  in DIMACS:
 4952 -4953 -4954  0
c  -3 does not represent an automaton state.
c    -( b^{2, 102}_2 ∧  b^{2, 102}_1 ∧  b^{2, 102}_0 ∧ true) 
c  in CNF:
c    -b^{2, 102}_2 ∨ -b^{2, 102}_1 ∨ -b^{2, 102}_0 ∨ false 
c  in DIMACS:
-4952 -4953 -4954  0

c i = 103
c  -2+1 --> -1
c    ( b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧  p_206) -> ( b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0)
c  in CNF:
c    -b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨  b^{2, 104}_2
c    -b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_1
c    -b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨  b^{2, 104}_0
c  in DIMACS:
-4955 -4956  4957 -206  4958 0
-4955 -4956  4957 -206 -4959 0
-4955 -4956  4957 -206  4960 0

c  -1+1 --> 0
c    ( b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0 ∧  p_206) -> (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧ -b^{2, 104}_0)
c  in CNF:
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_2
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_1
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_0
c  in DIMACS:
-4955  4956 -4957 -206 -4958 0
-4955  4956 -4957 -206 -4959 0
-4955  4956 -4957 -206 -4960 0

c  0+1 --> 1
c    (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧  p_206) -> (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0)
c  in CNF:
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_2
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_1
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨  b^{2, 104}_0
c  in DIMACS:
 4955  4956  4957 -206 -4958 0
 4955  4956  4957 -206 -4959 0
 4955  4956  4957 -206  4960 0

c  1+1 --> 2
c    (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0 ∧  p_206) -> (-b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0)
c  in CNF:
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_2
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨  b^{2, 104}_1
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ -p_206 ∨ -b^{2, 104}_0
c  in DIMACS:
 4955  4956 -4957 -206 -4958 0
 4955  4956 -4957 -206  4959 0
 4955  4956 -4957 -206 -4960 0

c  2+1 --> break 
c    (-b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧  p_206) -> break
c  in CNF:
c     b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ -p_206 ∨ break
c  in DIMACS:
 4955 -4956  4957 -206 1162 0


c  2-1 --> 1
c    (-b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧ -p_206) -> (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0)
c  in CNF:
c     b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_2
c     b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_1
c     b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨  b^{2, 104}_0
c  in DIMACS:
 4955 -4956  4957  206 -4958 0
 4955 -4956  4957  206 -4959 0
 4955 -4956  4957  206  4960 0

c  1-1 --> 0
c    (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0 ∧ -p_206) -> (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧ -b^{2, 104}_0)
c  in CNF:
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_2
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_1
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_0
c  in DIMACS:
 4955  4956 -4957  206 -4958 0
 4955  4956 -4957  206 -4959 0
 4955  4956 -4957  206 -4960 0

c  0-1 --> -1
c    (-b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧ -p_206) -> ( b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0)
c  in CNF:
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨  b^{2, 104}_2
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_1
c     b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨  b^{2, 104}_0
c  in DIMACS:
 4955  4956  4957  206  4958 0
 4955  4956  4957  206 -4959 0
 4955  4956  4957  206  4960 0

c  -1-1 --> -2
c    ( b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧  b^{2, 103}_0 ∧ -p_206) -> ( b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0)
c  in CNF:
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨  b^{2, 104}_2
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨  b^{2, 104}_1
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨  p_206 ∨ -b^{2, 104}_0
c  in DIMACS:
-4955  4956 -4957  206  4958 0
-4955  4956 -4957  206  4959 0
-4955  4956 -4957  206 -4960 0

c  -2-1 --> break 
c    ( b^{2, 103}_2 ∧  b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧ -p_206) -> break
c  in CNF:
c    -b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨  b^{2, 103}_0 ∨  p_206 ∨ break
c  in DIMACS:
-4955 -4956  4957  206 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 103}_2 ∧ -b^{2, 103}_1 ∧ -b^{2, 103}_0 ∧ true) 
c  in CNF:
c    -b^{2, 103}_2 ∨  b^{2, 103}_1 ∨  b^{2, 103}_0 ∨ false 
c  in DIMACS:
-4955  4956  4957  0

c  3 does not represent an automaton state.
c    -(-b^{2, 103}_2 ∧  b^{2, 103}_1 ∧  b^{2, 103}_0 ∧ true) 
c  in CNF:
c     b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ false 
c  in DIMACS:
 4955 -4956 -4957  0
c  -3 does not represent an automaton state.
c    -( b^{2, 103}_2 ∧  b^{2, 103}_1 ∧  b^{2, 103}_0 ∧ true) 
c  in CNF:
c    -b^{2, 103}_2 ∨ -b^{2, 103}_1 ∨ -b^{2, 103}_0 ∨ false 
c  in DIMACS:
-4955 -4956 -4957  0

c i = 104
c  -2+1 --> -1
c    ( b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧  p_208) -> ( b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0)
c  in CNF:
c    -b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨  b^{2, 105}_2
c    -b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_1
c    -b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨  b^{2, 105}_0
c  in DIMACS:
-4958 -4959  4960 -208  4961 0
-4958 -4959  4960 -208 -4962 0
-4958 -4959  4960 -208  4963 0

c  -1+1 --> 0
c    ( b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0 ∧  p_208) -> (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧ -b^{2, 105}_0)
c  in CNF:
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_2
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_1
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_0
c  in DIMACS:
-4958  4959 -4960 -208 -4961 0
-4958  4959 -4960 -208 -4962 0
-4958  4959 -4960 -208 -4963 0

c  0+1 --> 1
c    (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧  p_208) -> (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0)
c  in CNF:
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_2
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_1
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨  b^{2, 105}_0
c  in DIMACS:
 4958  4959  4960 -208 -4961 0
 4958  4959  4960 -208 -4962 0
 4958  4959  4960 -208  4963 0

c  1+1 --> 2
c    (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0 ∧  p_208) -> (-b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0)
c  in CNF:
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_2
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨  b^{2, 105}_1
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ -p_208 ∨ -b^{2, 105}_0
c  in DIMACS:
 4958  4959 -4960 -208 -4961 0
 4958  4959 -4960 -208  4962 0
 4958  4959 -4960 -208 -4963 0

c  2+1 --> break 
c    (-b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧  p_208) -> break
c  in CNF:
c     b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 4958 -4959  4960 -208 1162 0


c  2-1 --> 1
c    (-b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧ -p_208) -> (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0)
c  in CNF:
c     b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_2
c     b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_1
c     b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨  b^{2, 105}_0
c  in DIMACS:
 4958 -4959  4960  208 -4961 0
 4958 -4959  4960  208 -4962 0
 4958 -4959  4960  208  4963 0

c  1-1 --> 0
c    (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0 ∧ -p_208) -> (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧ -b^{2, 105}_0)
c  in CNF:
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_2
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_1
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_0
c  in DIMACS:
 4958  4959 -4960  208 -4961 0
 4958  4959 -4960  208 -4962 0
 4958  4959 -4960  208 -4963 0

c  0-1 --> -1
c    (-b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧ -p_208) -> ( b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0)
c  in CNF:
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨  b^{2, 105}_2
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_1
c     b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨  b^{2, 105}_0
c  in DIMACS:
 4958  4959  4960  208  4961 0
 4958  4959  4960  208 -4962 0
 4958  4959  4960  208  4963 0

c  -1-1 --> -2
c    ( b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧  b^{2, 104}_0 ∧ -p_208) -> ( b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0)
c  in CNF:
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨  b^{2, 105}_2
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨  b^{2, 105}_1
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨  p_208 ∨ -b^{2, 105}_0
c  in DIMACS:
-4958  4959 -4960  208  4961 0
-4958  4959 -4960  208  4962 0
-4958  4959 -4960  208 -4963 0

c  -2-1 --> break 
c    ( b^{2, 104}_2 ∧  b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨  b^{2, 104}_0 ∨  p_208 ∨ break
c  in DIMACS:
-4958 -4959  4960  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 104}_2 ∧ -b^{2, 104}_1 ∧ -b^{2, 104}_0 ∧ true) 
c  in CNF:
c    -b^{2, 104}_2 ∨  b^{2, 104}_1 ∨  b^{2, 104}_0 ∨ false 
c  in DIMACS:
-4958  4959  4960  0

c  3 does not represent an automaton state.
c    -(-b^{2, 104}_2 ∧  b^{2, 104}_1 ∧  b^{2, 104}_0 ∧ true) 
c  in CNF:
c     b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ false 
c  in DIMACS:
 4958 -4959 -4960  0
c  -3 does not represent an automaton state.
c    -( b^{2, 104}_2 ∧  b^{2, 104}_1 ∧  b^{2, 104}_0 ∧ true) 
c  in CNF:
c    -b^{2, 104}_2 ∨ -b^{2, 104}_1 ∨ -b^{2, 104}_0 ∨ false 
c  in DIMACS:
-4958 -4959 -4960  0

c i = 105
c  -2+1 --> -1
c    ( b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧  p_210) -> ( b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0)
c  in CNF:
c    -b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨  b^{2, 106}_2
c    -b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_1
c    -b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨  b^{2, 106}_0
c  in DIMACS:
-4961 -4962  4963 -210  4964 0
-4961 -4962  4963 -210 -4965 0
-4961 -4962  4963 -210  4966 0

c  -1+1 --> 0
c    ( b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0 ∧  p_210) -> (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧ -b^{2, 106}_0)
c  in CNF:
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_2
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_1
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_0
c  in DIMACS:
-4961  4962 -4963 -210 -4964 0
-4961  4962 -4963 -210 -4965 0
-4961  4962 -4963 -210 -4966 0

c  0+1 --> 1
c    (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧  p_210) -> (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0)
c  in CNF:
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_2
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_1
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨  b^{2, 106}_0
c  in DIMACS:
 4961  4962  4963 -210 -4964 0
 4961  4962  4963 -210 -4965 0
 4961  4962  4963 -210  4966 0

c  1+1 --> 2
c    (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0 ∧  p_210) -> (-b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0)
c  in CNF:
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_2
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨  b^{2, 106}_1
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ -p_210 ∨ -b^{2, 106}_0
c  in DIMACS:
 4961  4962 -4963 -210 -4964 0
 4961  4962 -4963 -210  4965 0
 4961  4962 -4963 -210 -4966 0

c  2+1 --> break 
c    (-b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧  p_210) -> break
c  in CNF:
c     b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 4961 -4962  4963 -210 1162 0


c  2-1 --> 1
c    (-b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧ -p_210) -> (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0)
c  in CNF:
c     b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_2
c     b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_1
c     b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨  b^{2, 106}_0
c  in DIMACS:
 4961 -4962  4963  210 -4964 0
 4961 -4962  4963  210 -4965 0
 4961 -4962  4963  210  4966 0

c  1-1 --> 0
c    (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0 ∧ -p_210) -> (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧ -b^{2, 106}_0)
c  in CNF:
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_2
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_1
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_0
c  in DIMACS:
 4961  4962 -4963  210 -4964 0
 4961  4962 -4963  210 -4965 0
 4961  4962 -4963  210 -4966 0

c  0-1 --> -1
c    (-b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧ -p_210) -> ( b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0)
c  in CNF:
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨  b^{2, 106}_2
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_1
c     b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨  b^{2, 106}_0
c  in DIMACS:
 4961  4962  4963  210  4964 0
 4961  4962  4963  210 -4965 0
 4961  4962  4963  210  4966 0

c  -1-1 --> -2
c    ( b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧  b^{2, 105}_0 ∧ -p_210) -> ( b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0)
c  in CNF:
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨  b^{2, 106}_2
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨  b^{2, 106}_1
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨  p_210 ∨ -b^{2, 106}_0
c  in DIMACS:
-4961  4962 -4963  210  4964 0
-4961  4962 -4963  210  4965 0
-4961  4962 -4963  210 -4966 0

c  -2-1 --> break 
c    ( b^{2, 105}_2 ∧  b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨  b^{2, 105}_0 ∨  p_210 ∨ break
c  in DIMACS:
-4961 -4962  4963  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 105}_2 ∧ -b^{2, 105}_1 ∧ -b^{2, 105}_0 ∧ true) 
c  in CNF:
c    -b^{2, 105}_2 ∨  b^{2, 105}_1 ∨  b^{2, 105}_0 ∨ false 
c  in DIMACS:
-4961  4962  4963  0

c  3 does not represent an automaton state.
c    -(-b^{2, 105}_2 ∧  b^{2, 105}_1 ∧  b^{2, 105}_0 ∧ true) 
c  in CNF:
c     b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ false 
c  in DIMACS:
 4961 -4962 -4963  0
c  -3 does not represent an automaton state.
c    -( b^{2, 105}_2 ∧  b^{2, 105}_1 ∧  b^{2, 105}_0 ∧ true) 
c  in CNF:
c    -b^{2, 105}_2 ∨ -b^{2, 105}_1 ∨ -b^{2, 105}_0 ∨ false 
c  in DIMACS:
-4961 -4962 -4963  0

c i = 106
c  -2+1 --> -1
c    ( b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧  p_212) -> ( b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0)
c  in CNF:
c    -b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨  b^{2, 107}_2
c    -b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_1
c    -b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨  b^{2, 107}_0
c  in DIMACS:
-4964 -4965  4966 -212  4967 0
-4964 -4965  4966 -212 -4968 0
-4964 -4965  4966 -212  4969 0

c  -1+1 --> 0
c    ( b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0 ∧  p_212) -> (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧ -b^{2, 107}_0)
c  in CNF:
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_2
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_1
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_0
c  in DIMACS:
-4964  4965 -4966 -212 -4967 0
-4964  4965 -4966 -212 -4968 0
-4964  4965 -4966 -212 -4969 0

c  0+1 --> 1
c    (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧  p_212) -> (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0)
c  in CNF:
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_2
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_1
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨  b^{2, 107}_0
c  in DIMACS:
 4964  4965  4966 -212 -4967 0
 4964  4965  4966 -212 -4968 0
 4964  4965  4966 -212  4969 0

c  1+1 --> 2
c    (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0 ∧  p_212) -> (-b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0)
c  in CNF:
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_2
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨  b^{2, 107}_1
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ -p_212 ∨ -b^{2, 107}_0
c  in DIMACS:
 4964  4965 -4966 -212 -4967 0
 4964  4965 -4966 -212  4968 0
 4964  4965 -4966 -212 -4969 0

c  2+1 --> break 
c    (-b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧  p_212) -> break
c  in CNF:
c     b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 4964 -4965  4966 -212 1162 0


c  2-1 --> 1
c    (-b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧ -p_212) -> (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0)
c  in CNF:
c     b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_2
c     b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_1
c     b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨  b^{2, 107}_0
c  in DIMACS:
 4964 -4965  4966  212 -4967 0
 4964 -4965  4966  212 -4968 0
 4964 -4965  4966  212  4969 0

c  1-1 --> 0
c    (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0 ∧ -p_212) -> (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧ -b^{2, 107}_0)
c  in CNF:
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_2
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_1
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_0
c  in DIMACS:
 4964  4965 -4966  212 -4967 0
 4964  4965 -4966  212 -4968 0
 4964  4965 -4966  212 -4969 0

c  0-1 --> -1
c    (-b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧ -p_212) -> ( b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0)
c  in CNF:
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨  b^{2, 107}_2
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_1
c     b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨  b^{2, 107}_0
c  in DIMACS:
 4964  4965  4966  212  4967 0
 4964  4965  4966  212 -4968 0
 4964  4965  4966  212  4969 0

c  -1-1 --> -2
c    ( b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧  b^{2, 106}_0 ∧ -p_212) -> ( b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0)
c  in CNF:
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨  b^{2, 107}_2
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨  b^{2, 107}_1
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨  p_212 ∨ -b^{2, 107}_0
c  in DIMACS:
-4964  4965 -4966  212  4967 0
-4964  4965 -4966  212  4968 0
-4964  4965 -4966  212 -4969 0

c  -2-1 --> break 
c    ( b^{2, 106}_2 ∧  b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨  b^{2, 106}_0 ∨  p_212 ∨ break
c  in DIMACS:
-4964 -4965  4966  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 106}_2 ∧ -b^{2, 106}_1 ∧ -b^{2, 106}_0 ∧ true) 
c  in CNF:
c    -b^{2, 106}_2 ∨  b^{2, 106}_1 ∨  b^{2, 106}_0 ∨ false 
c  in DIMACS:
-4964  4965  4966  0

c  3 does not represent an automaton state.
c    -(-b^{2, 106}_2 ∧  b^{2, 106}_1 ∧  b^{2, 106}_0 ∧ true) 
c  in CNF:
c     b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ false 
c  in DIMACS:
 4964 -4965 -4966  0
c  -3 does not represent an automaton state.
c    -( b^{2, 106}_2 ∧  b^{2, 106}_1 ∧  b^{2, 106}_0 ∧ true) 
c  in CNF:
c    -b^{2, 106}_2 ∨ -b^{2, 106}_1 ∨ -b^{2, 106}_0 ∨ false 
c  in DIMACS:
-4964 -4965 -4966  0

c i = 107
c  -2+1 --> -1
c    ( b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧  p_214) -> ( b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0)
c  in CNF:
c    -b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨  b^{2, 108}_2
c    -b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_1
c    -b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨  b^{2, 108}_0
c  in DIMACS:
-4967 -4968  4969 -214  4970 0
-4967 -4968  4969 -214 -4971 0
-4967 -4968  4969 -214  4972 0

c  -1+1 --> 0
c    ( b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0 ∧  p_214) -> (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧ -b^{2, 108}_0)
c  in CNF:
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_2
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_1
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_0
c  in DIMACS:
-4967  4968 -4969 -214 -4970 0
-4967  4968 -4969 -214 -4971 0
-4967  4968 -4969 -214 -4972 0

c  0+1 --> 1
c    (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧  p_214) -> (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0)
c  in CNF:
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_2
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_1
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨  b^{2, 108}_0
c  in DIMACS:
 4967  4968  4969 -214 -4970 0
 4967  4968  4969 -214 -4971 0
 4967  4968  4969 -214  4972 0

c  1+1 --> 2
c    (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0 ∧  p_214) -> (-b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0)
c  in CNF:
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_2
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨  b^{2, 108}_1
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ -p_214 ∨ -b^{2, 108}_0
c  in DIMACS:
 4967  4968 -4969 -214 -4970 0
 4967  4968 -4969 -214  4971 0
 4967  4968 -4969 -214 -4972 0

c  2+1 --> break 
c    (-b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧  p_214) -> break
c  in CNF:
c     b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ -p_214 ∨ break
c  in DIMACS:
 4967 -4968  4969 -214 1162 0


c  2-1 --> 1
c    (-b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧ -p_214) -> (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0)
c  in CNF:
c     b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_2
c     b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_1
c     b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨  b^{2, 108}_0
c  in DIMACS:
 4967 -4968  4969  214 -4970 0
 4967 -4968  4969  214 -4971 0
 4967 -4968  4969  214  4972 0

c  1-1 --> 0
c    (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0 ∧ -p_214) -> (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧ -b^{2, 108}_0)
c  in CNF:
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_2
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_1
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_0
c  in DIMACS:
 4967  4968 -4969  214 -4970 0
 4967  4968 -4969  214 -4971 0
 4967  4968 -4969  214 -4972 0

c  0-1 --> -1
c    (-b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧ -p_214) -> ( b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0)
c  in CNF:
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨  b^{2, 108}_2
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_1
c     b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨  b^{2, 108}_0
c  in DIMACS:
 4967  4968  4969  214  4970 0
 4967  4968  4969  214 -4971 0
 4967  4968  4969  214  4972 0

c  -1-1 --> -2
c    ( b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧  b^{2, 107}_0 ∧ -p_214) -> ( b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0)
c  in CNF:
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨  b^{2, 108}_2
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨  b^{2, 108}_1
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨  p_214 ∨ -b^{2, 108}_0
c  in DIMACS:
-4967  4968 -4969  214  4970 0
-4967  4968 -4969  214  4971 0
-4967  4968 -4969  214 -4972 0

c  -2-1 --> break 
c    ( b^{2, 107}_2 ∧  b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧ -p_214) -> break
c  in CNF:
c    -b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨  b^{2, 107}_0 ∨  p_214 ∨ break
c  in DIMACS:
-4967 -4968  4969  214 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 107}_2 ∧ -b^{2, 107}_1 ∧ -b^{2, 107}_0 ∧ true) 
c  in CNF:
c    -b^{2, 107}_2 ∨  b^{2, 107}_1 ∨  b^{2, 107}_0 ∨ false 
c  in DIMACS:
-4967  4968  4969  0

c  3 does not represent an automaton state.
c    -(-b^{2, 107}_2 ∧  b^{2, 107}_1 ∧  b^{2, 107}_0 ∧ true) 
c  in CNF:
c     b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ false 
c  in DIMACS:
 4967 -4968 -4969  0
c  -3 does not represent an automaton state.
c    -( b^{2, 107}_2 ∧  b^{2, 107}_1 ∧  b^{2, 107}_0 ∧ true) 
c  in CNF:
c    -b^{2, 107}_2 ∨ -b^{2, 107}_1 ∨ -b^{2, 107}_0 ∨ false 
c  in DIMACS:
-4967 -4968 -4969  0

c i = 108
c  -2+1 --> -1
c    ( b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧  p_216) -> ( b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0)
c  in CNF:
c    -b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨  b^{2, 109}_2
c    -b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_1
c    -b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨  b^{2, 109}_0
c  in DIMACS:
-4970 -4971  4972 -216  4973 0
-4970 -4971  4972 -216 -4974 0
-4970 -4971  4972 -216  4975 0

c  -1+1 --> 0
c    ( b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0 ∧  p_216) -> (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧ -b^{2, 109}_0)
c  in CNF:
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_2
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_1
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_0
c  in DIMACS:
-4970  4971 -4972 -216 -4973 0
-4970  4971 -4972 -216 -4974 0
-4970  4971 -4972 -216 -4975 0

c  0+1 --> 1
c    (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧  p_216) -> (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0)
c  in CNF:
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_2
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_1
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨  b^{2, 109}_0
c  in DIMACS:
 4970  4971  4972 -216 -4973 0
 4970  4971  4972 -216 -4974 0
 4970  4971  4972 -216  4975 0

c  1+1 --> 2
c    (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0 ∧  p_216) -> (-b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0)
c  in CNF:
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_2
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨  b^{2, 109}_1
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ -p_216 ∨ -b^{2, 109}_0
c  in DIMACS:
 4970  4971 -4972 -216 -4973 0
 4970  4971 -4972 -216  4974 0
 4970  4971 -4972 -216 -4975 0

c  2+1 --> break 
c    (-b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧  p_216) -> break
c  in CNF:
c     b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 4970 -4971  4972 -216 1162 0


c  2-1 --> 1
c    (-b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧ -p_216) -> (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0)
c  in CNF:
c     b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_2
c     b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_1
c     b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨  b^{2, 109}_0
c  in DIMACS:
 4970 -4971  4972  216 -4973 0
 4970 -4971  4972  216 -4974 0
 4970 -4971  4972  216  4975 0

c  1-1 --> 0
c    (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0 ∧ -p_216) -> (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧ -b^{2, 109}_0)
c  in CNF:
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_2
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_1
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_0
c  in DIMACS:
 4970  4971 -4972  216 -4973 0
 4970  4971 -4972  216 -4974 0
 4970  4971 -4972  216 -4975 0

c  0-1 --> -1
c    (-b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧ -p_216) -> ( b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0)
c  in CNF:
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨  b^{2, 109}_2
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_1
c     b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨  b^{2, 109}_0
c  in DIMACS:
 4970  4971  4972  216  4973 0
 4970  4971  4972  216 -4974 0
 4970  4971  4972  216  4975 0

c  -1-1 --> -2
c    ( b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧  b^{2, 108}_0 ∧ -p_216) -> ( b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0)
c  in CNF:
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨  b^{2, 109}_2
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨  b^{2, 109}_1
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨  p_216 ∨ -b^{2, 109}_0
c  in DIMACS:
-4970  4971 -4972  216  4973 0
-4970  4971 -4972  216  4974 0
-4970  4971 -4972  216 -4975 0

c  -2-1 --> break 
c    ( b^{2, 108}_2 ∧  b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨  b^{2, 108}_0 ∨  p_216 ∨ break
c  in DIMACS:
-4970 -4971  4972  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 108}_2 ∧ -b^{2, 108}_1 ∧ -b^{2, 108}_0 ∧ true) 
c  in CNF:
c    -b^{2, 108}_2 ∨  b^{2, 108}_1 ∨  b^{2, 108}_0 ∨ false 
c  in DIMACS:
-4970  4971  4972  0

c  3 does not represent an automaton state.
c    -(-b^{2, 108}_2 ∧  b^{2, 108}_1 ∧  b^{2, 108}_0 ∧ true) 
c  in CNF:
c     b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ false 
c  in DIMACS:
 4970 -4971 -4972  0
c  -3 does not represent an automaton state.
c    -( b^{2, 108}_2 ∧  b^{2, 108}_1 ∧  b^{2, 108}_0 ∧ true) 
c  in CNF:
c    -b^{2, 108}_2 ∨ -b^{2, 108}_1 ∨ -b^{2, 108}_0 ∨ false 
c  in DIMACS:
-4970 -4971 -4972  0

c i = 109
c  -2+1 --> -1
c    ( b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧  p_218) -> ( b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0)
c  in CNF:
c    -b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨  b^{2, 110}_2
c    -b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_1
c    -b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨  b^{2, 110}_0
c  in DIMACS:
-4973 -4974  4975 -218  4976 0
-4973 -4974  4975 -218 -4977 0
-4973 -4974  4975 -218  4978 0

c  -1+1 --> 0
c    ( b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0 ∧  p_218) -> (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧ -b^{2, 110}_0)
c  in CNF:
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_2
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_1
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_0
c  in DIMACS:
-4973  4974 -4975 -218 -4976 0
-4973  4974 -4975 -218 -4977 0
-4973  4974 -4975 -218 -4978 0

c  0+1 --> 1
c    (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧  p_218) -> (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0)
c  in CNF:
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_2
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_1
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨  b^{2, 110}_0
c  in DIMACS:
 4973  4974  4975 -218 -4976 0
 4973  4974  4975 -218 -4977 0
 4973  4974  4975 -218  4978 0

c  1+1 --> 2
c    (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0 ∧  p_218) -> (-b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0)
c  in CNF:
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_2
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨  b^{2, 110}_1
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ -p_218 ∨ -b^{2, 110}_0
c  in DIMACS:
 4973  4974 -4975 -218 -4976 0
 4973  4974 -4975 -218  4977 0
 4973  4974 -4975 -218 -4978 0

c  2+1 --> break 
c    (-b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧  p_218) -> break
c  in CNF:
c     b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ -p_218 ∨ break
c  in DIMACS:
 4973 -4974  4975 -218 1162 0


c  2-1 --> 1
c    (-b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧ -p_218) -> (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0)
c  in CNF:
c     b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_2
c     b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_1
c     b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨  b^{2, 110}_0
c  in DIMACS:
 4973 -4974  4975  218 -4976 0
 4973 -4974  4975  218 -4977 0
 4973 -4974  4975  218  4978 0

c  1-1 --> 0
c    (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0 ∧ -p_218) -> (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧ -b^{2, 110}_0)
c  in CNF:
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_2
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_1
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_0
c  in DIMACS:
 4973  4974 -4975  218 -4976 0
 4973  4974 -4975  218 -4977 0
 4973  4974 -4975  218 -4978 0

c  0-1 --> -1
c    (-b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧ -p_218) -> ( b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0)
c  in CNF:
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨  b^{2, 110}_2
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_1
c     b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨  b^{2, 110}_0
c  in DIMACS:
 4973  4974  4975  218  4976 0
 4973  4974  4975  218 -4977 0
 4973  4974  4975  218  4978 0

c  -1-1 --> -2
c    ( b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧  b^{2, 109}_0 ∧ -p_218) -> ( b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0)
c  in CNF:
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨  b^{2, 110}_2
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨  b^{2, 110}_1
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨  p_218 ∨ -b^{2, 110}_0
c  in DIMACS:
-4973  4974 -4975  218  4976 0
-4973  4974 -4975  218  4977 0
-4973  4974 -4975  218 -4978 0

c  -2-1 --> break 
c    ( b^{2, 109}_2 ∧  b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧ -p_218) -> break
c  in CNF:
c    -b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨  b^{2, 109}_0 ∨  p_218 ∨ break
c  in DIMACS:
-4973 -4974  4975  218 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 109}_2 ∧ -b^{2, 109}_1 ∧ -b^{2, 109}_0 ∧ true) 
c  in CNF:
c    -b^{2, 109}_2 ∨  b^{2, 109}_1 ∨  b^{2, 109}_0 ∨ false 
c  in DIMACS:
-4973  4974  4975  0

c  3 does not represent an automaton state.
c    -(-b^{2, 109}_2 ∧  b^{2, 109}_1 ∧  b^{2, 109}_0 ∧ true) 
c  in CNF:
c     b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ false 
c  in DIMACS:
 4973 -4974 -4975  0
c  -3 does not represent an automaton state.
c    -( b^{2, 109}_2 ∧  b^{2, 109}_1 ∧  b^{2, 109}_0 ∧ true) 
c  in CNF:
c    -b^{2, 109}_2 ∨ -b^{2, 109}_1 ∨ -b^{2, 109}_0 ∨ false 
c  in DIMACS:
-4973 -4974 -4975  0

c i = 110
c  -2+1 --> -1
c    ( b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧  p_220) -> ( b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0)
c  in CNF:
c    -b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨  b^{2, 111}_2
c    -b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_1
c    -b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨  b^{2, 111}_0
c  in DIMACS:
-4976 -4977  4978 -220  4979 0
-4976 -4977  4978 -220 -4980 0
-4976 -4977  4978 -220  4981 0

c  -1+1 --> 0
c    ( b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0 ∧  p_220) -> (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧ -b^{2, 111}_0)
c  in CNF:
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_2
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_1
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_0
c  in DIMACS:
-4976  4977 -4978 -220 -4979 0
-4976  4977 -4978 -220 -4980 0
-4976  4977 -4978 -220 -4981 0

c  0+1 --> 1
c    (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧  p_220) -> (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0)
c  in CNF:
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_2
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_1
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨  b^{2, 111}_0
c  in DIMACS:
 4976  4977  4978 -220 -4979 0
 4976  4977  4978 -220 -4980 0
 4976  4977  4978 -220  4981 0

c  1+1 --> 2
c    (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0 ∧  p_220) -> (-b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0)
c  in CNF:
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_2
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨  b^{2, 111}_1
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ -p_220 ∨ -b^{2, 111}_0
c  in DIMACS:
 4976  4977 -4978 -220 -4979 0
 4976  4977 -4978 -220  4980 0
 4976  4977 -4978 -220 -4981 0

c  2+1 --> break 
c    (-b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧  p_220) -> break
c  in CNF:
c     b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 4976 -4977  4978 -220 1162 0


c  2-1 --> 1
c    (-b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧ -p_220) -> (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0)
c  in CNF:
c     b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_2
c     b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_1
c     b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨  b^{2, 111}_0
c  in DIMACS:
 4976 -4977  4978  220 -4979 0
 4976 -4977  4978  220 -4980 0
 4976 -4977  4978  220  4981 0

c  1-1 --> 0
c    (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0 ∧ -p_220) -> (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧ -b^{2, 111}_0)
c  in CNF:
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_2
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_1
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_0
c  in DIMACS:
 4976  4977 -4978  220 -4979 0
 4976  4977 -4978  220 -4980 0
 4976  4977 -4978  220 -4981 0

c  0-1 --> -1
c    (-b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧ -p_220) -> ( b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0)
c  in CNF:
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨  b^{2, 111}_2
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_1
c     b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨  b^{2, 111}_0
c  in DIMACS:
 4976  4977  4978  220  4979 0
 4976  4977  4978  220 -4980 0
 4976  4977  4978  220  4981 0

c  -1-1 --> -2
c    ( b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧  b^{2, 110}_0 ∧ -p_220) -> ( b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0)
c  in CNF:
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨  b^{2, 111}_2
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨  b^{2, 111}_1
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨  p_220 ∨ -b^{2, 111}_0
c  in DIMACS:
-4976  4977 -4978  220  4979 0
-4976  4977 -4978  220  4980 0
-4976  4977 -4978  220 -4981 0

c  -2-1 --> break 
c    ( b^{2, 110}_2 ∧  b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨  b^{2, 110}_0 ∨  p_220 ∨ break
c  in DIMACS:
-4976 -4977  4978  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 110}_2 ∧ -b^{2, 110}_1 ∧ -b^{2, 110}_0 ∧ true) 
c  in CNF:
c    -b^{2, 110}_2 ∨  b^{2, 110}_1 ∨  b^{2, 110}_0 ∨ false 
c  in DIMACS:
-4976  4977  4978  0

c  3 does not represent an automaton state.
c    -(-b^{2, 110}_2 ∧  b^{2, 110}_1 ∧  b^{2, 110}_0 ∧ true) 
c  in CNF:
c     b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ false 
c  in DIMACS:
 4976 -4977 -4978  0
c  -3 does not represent an automaton state.
c    -( b^{2, 110}_2 ∧  b^{2, 110}_1 ∧  b^{2, 110}_0 ∧ true) 
c  in CNF:
c    -b^{2, 110}_2 ∨ -b^{2, 110}_1 ∨ -b^{2, 110}_0 ∨ false 
c  in DIMACS:
-4976 -4977 -4978  0

c i = 111
c  -2+1 --> -1
c    ( b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧  p_222) -> ( b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0)
c  in CNF:
c    -b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨  b^{2, 112}_2
c    -b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_1
c    -b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨  b^{2, 112}_0
c  in DIMACS:
-4979 -4980  4981 -222  4982 0
-4979 -4980  4981 -222 -4983 0
-4979 -4980  4981 -222  4984 0

c  -1+1 --> 0
c    ( b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0 ∧  p_222) -> (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧ -b^{2, 112}_0)
c  in CNF:
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_2
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_1
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_0
c  in DIMACS:
-4979  4980 -4981 -222 -4982 0
-4979  4980 -4981 -222 -4983 0
-4979  4980 -4981 -222 -4984 0

c  0+1 --> 1
c    (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧  p_222) -> (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0)
c  in CNF:
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_2
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_1
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨  b^{2, 112}_0
c  in DIMACS:
 4979  4980  4981 -222 -4982 0
 4979  4980  4981 -222 -4983 0
 4979  4980  4981 -222  4984 0

c  1+1 --> 2
c    (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0 ∧  p_222) -> (-b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0)
c  in CNF:
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_2
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨  b^{2, 112}_1
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ -p_222 ∨ -b^{2, 112}_0
c  in DIMACS:
 4979  4980 -4981 -222 -4982 0
 4979  4980 -4981 -222  4983 0
 4979  4980 -4981 -222 -4984 0

c  2+1 --> break 
c    (-b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧  p_222) -> break
c  in CNF:
c     b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 4979 -4980  4981 -222 1162 0


c  2-1 --> 1
c    (-b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧ -p_222) -> (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0)
c  in CNF:
c     b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_2
c     b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_1
c     b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨  b^{2, 112}_0
c  in DIMACS:
 4979 -4980  4981  222 -4982 0
 4979 -4980  4981  222 -4983 0
 4979 -4980  4981  222  4984 0

c  1-1 --> 0
c    (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0 ∧ -p_222) -> (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧ -b^{2, 112}_0)
c  in CNF:
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_2
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_1
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_0
c  in DIMACS:
 4979  4980 -4981  222 -4982 0
 4979  4980 -4981  222 -4983 0
 4979  4980 -4981  222 -4984 0

c  0-1 --> -1
c    (-b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧ -p_222) -> ( b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0)
c  in CNF:
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨  b^{2, 112}_2
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_1
c     b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨  b^{2, 112}_0
c  in DIMACS:
 4979  4980  4981  222  4982 0
 4979  4980  4981  222 -4983 0
 4979  4980  4981  222  4984 0

c  -1-1 --> -2
c    ( b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧  b^{2, 111}_0 ∧ -p_222) -> ( b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0)
c  in CNF:
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨  b^{2, 112}_2
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨  b^{2, 112}_1
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨  p_222 ∨ -b^{2, 112}_0
c  in DIMACS:
-4979  4980 -4981  222  4982 0
-4979  4980 -4981  222  4983 0
-4979  4980 -4981  222 -4984 0

c  -2-1 --> break 
c    ( b^{2, 111}_2 ∧  b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨  b^{2, 111}_0 ∨  p_222 ∨ break
c  in DIMACS:
-4979 -4980  4981  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 111}_2 ∧ -b^{2, 111}_1 ∧ -b^{2, 111}_0 ∧ true) 
c  in CNF:
c    -b^{2, 111}_2 ∨  b^{2, 111}_1 ∨  b^{2, 111}_0 ∨ false 
c  in DIMACS:
-4979  4980  4981  0

c  3 does not represent an automaton state.
c    -(-b^{2, 111}_2 ∧  b^{2, 111}_1 ∧  b^{2, 111}_0 ∧ true) 
c  in CNF:
c     b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ false 
c  in DIMACS:
 4979 -4980 -4981  0
c  -3 does not represent an automaton state.
c    -( b^{2, 111}_2 ∧  b^{2, 111}_1 ∧  b^{2, 111}_0 ∧ true) 
c  in CNF:
c    -b^{2, 111}_2 ∨ -b^{2, 111}_1 ∨ -b^{2, 111}_0 ∨ false 
c  in DIMACS:
-4979 -4980 -4981  0

c i = 112
c  -2+1 --> -1
c    ( b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧  p_224) -> ( b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0)
c  in CNF:
c    -b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨  b^{2, 113}_2
c    -b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_1
c    -b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨  b^{2, 113}_0
c  in DIMACS:
-4982 -4983  4984 -224  4985 0
-4982 -4983  4984 -224 -4986 0
-4982 -4983  4984 -224  4987 0

c  -1+1 --> 0
c    ( b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0 ∧  p_224) -> (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧ -b^{2, 113}_0)
c  in CNF:
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_2
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_1
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_0
c  in DIMACS:
-4982  4983 -4984 -224 -4985 0
-4982  4983 -4984 -224 -4986 0
-4982  4983 -4984 -224 -4987 0

c  0+1 --> 1
c    (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧  p_224) -> (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0)
c  in CNF:
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_2
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_1
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨  b^{2, 113}_0
c  in DIMACS:
 4982  4983  4984 -224 -4985 0
 4982  4983  4984 -224 -4986 0
 4982  4983  4984 -224  4987 0

c  1+1 --> 2
c    (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0 ∧  p_224) -> (-b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0)
c  in CNF:
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_2
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨  b^{2, 113}_1
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ -p_224 ∨ -b^{2, 113}_0
c  in DIMACS:
 4982  4983 -4984 -224 -4985 0
 4982  4983 -4984 -224  4986 0
 4982  4983 -4984 -224 -4987 0

c  2+1 --> break 
c    (-b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧  p_224) -> break
c  in CNF:
c     b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 4982 -4983  4984 -224 1162 0


c  2-1 --> 1
c    (-b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧ -p_224) -> (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0)
c  in CNF:
c     b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_2
c     b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_1
c     b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨  b^{2, 113}_0
c  in DIMACS:
 4982 -4983  4984  224 -4985 0
 4982 -4983  4984  224 -4986 0
 4982 -4983  4984  224  4987 0

c  1-1 --> 0
c    (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0 ∧ -p_224) -> (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧ -b^{2, 113}_0)
c  in CNF:
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_2
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_1
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_0
c  in DIMACS:
 4982  4983 -4984  224 -4985 0
 4982  4983 -4984  224 -4986 0
 4982  4983 -4984  224 -4987 0

c  0-1 --> -1
c    (-b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧ -p_224) -> ( b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0)
c  in CNF:
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨  b^{2, 113}_2
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_1
c     b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨  b^{2, 113}_0
c  in DIMACS:
 4982  4983  4984  224  4985 0
 4982  4983  4984  224 -4986 0
 4982  4983  4984  224  4987 0

c  -1-1 --> -2
c    ( b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧  b^{2, 112}_0 ∧ -p_224) -> ( b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0)
c  in CNF:
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨  b^{2, 113}_2
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨  b^{2, 113}_1
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨  p_224 ∨ -b^{2, 113}_0
c  in DIMACS:
-4982  4983 -4984  224  4985 0
-4982  4983 -4984  224  4986 0
-4982  4983 -4984  224 -4987 0

c  -2-1 --> break 
c    ( b^{2, 112}_2 ∧  b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨  b^{2, 112}_0 ∨  p_224 ∨ break
c  in DIMACS:
-4982 -4983  4984  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 112}_2 ∧ -b^{2, 112}_1 ∧ -b^{2, 112}_0 ∧ true) 
c  in CNF:
c    -b^{2, 112}_2 ∨  b^{2, 112}_1 ∨  b^{2, 112}_0 ∨ false 
c  in DIMACS:
-4982  4983  4984  0

c  3 does not represent an automaton state.
c    -(-b^{2, 112}_2 ∧  b^{2, 112}_1 ∧  b^{2, 112}_0 ∧ true) 
c  in CNF:
c     b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ false 
c  in DIMACS:
 4982 -4983 -4984  0
c  -3 does not represent an automaton state.
c    -( b^{2, 112}_2 ∧  b^{2, 112}_1 ∧  b^{2, 112}_0 ∧ true) 
c  in CNF:
c    -b^{2, 112}_2 ∨ -b^{2, 112}_1 ∨ -b^{2, 112}_0 ∨ false 
c  in DIMACS:
-4982 -4983 -4984  0

c i = 113
c  -2+1 --> -1
c    ( b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧  p_226) -> ( b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0)
c  in CNF:
c    -b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨  b^{2, 114}_2
c    -b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_1
c    -b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨  b^{2, 114}_0
c  in DIMACS:
-4985 -4986  4987 -226  4988 0
-4985 -4986  4987 -226 -4989 0
-4985 -4986  4987 -226  4990 0

c  -1+1 --> 0
c    ( b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0 ∧  p_226) -> (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧ -b^{2, 114}_0)
c  in CNF:
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_2
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_1
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_0
c  in DIMACS:
-4985  4986 -4987 -226 -4988 0
-4985  4986 -4987 -226 -4989 0
-4985  4986 -4987 -226 -4990 0

c  0+1 --> 1
c    (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧  p_226) -> (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0)
c  in CNF:
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_2
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_1
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨  b^{2, 114}_0
c  in DIMACS:
 4985  4986  4987 -226 -4988 0
 4985  4986  4987 -226 -4989 0
 4985  4986  4987 -226  4990 0

c  1+1 --> 2
c    (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0 ∧  p_226) -> (-b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0)
c  in CNF:
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_2
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨  b^{2, 114}_1
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ -p_226 ∨ -b^{2, 114}_0
c  in DIMACS:
 4985  4986 -4987 -226 -4988 0
 4985  4986 -4987 -226  4989 0
 4985  4986 -4987 -226 -4990 0

c  2+1 --> break 
c    (-b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧  p_226) -> break
c  in CNF:
c     b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ -p_226 ∨ break
c  in DIMACS:
 4985 -4986  4987 -226 1162 0


c  2-1 --> 1
c    (-b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧ -p_226) -> (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0)
c  in CNF:
c     b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_2
c     b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_1
c     b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨  b^{2, 114}_0
c  in DIMACS:
 4985 -4986  4987  226 -4988 0
 4985 -4986  4987  226 -4989 0
 4985 -4986  4987  226  4990 0

c  1-1 --> 0
c    (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0 ∧ -p_226) -> (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧ -b^{2, 114}_0)
c  in CNF:
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_2
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_1
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_0
c  in DIMACS:
 4985  4986 -4987  226 -4988 0
 4985  4986 -4987  226 -4989 0
 4985  4986 -4987  226 -4990 0

c  0-1 --> -1
c    (-b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧ -p_226) -> ( b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0)
c  in CNF:
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨  b^{2, 114}_2
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_1
c     b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨  b^{2, 114}_0
c  in DIMACS:
 4985  4986  4987  226  4988 0
 4985  4986  4987  226 -4989 0
 4985  4986  4987  226  4990 0

c  -1-1 --> -2
c    ( b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧  b^{2, 113}_0 ∧ -p_226) -> ( b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0)
c  in CNF:
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨  b^{2, 114}_2
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨  b^{2, 114}_1
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨  p_226 ∨ -b^{2, 114}_0
c  in DIMACS:
-4985  4986 -4987  226  4988 0
-4985  4986 -4987  226  4989 0
-4985  4986 -4987  226 -4990 0

c  -2-1 --> break 
c    ( b^{2, 113}_2 ∧  b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧ -p_226) -> break
c  in CNF:
c    -b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨  b^{2, 113}_0 ∨  p_226 ∨ break
c  in DIMACS:
-4985 -4986  4987  226 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 113}_2 ∧ -b^{2, 113}_1 ∧ -b^{2, 113}_0 ∧ true) 
c  in CNF:
c    -b^{2, 113}_2 ∨  b^{2, 113}_1 ∨  b^{2, 113}_0 ∨ false 
c  in DIMACS:
-4985  4986  4987  0

c  3 does not represent an automaton state.
c    -(-b^{2, 113}_2 ∧  b^{2, 113}_1 ∧  b^{2, 113}_0 ∧ true) 
c  in CNF:
c     b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ false 
c  in DIMACS:
 4985 -4986 -4987  0
c  -3 does not represent an automaton state.
c    -( b^{2, 113}_2 ∧  b^{2, 113}_1 ∧  b^{2, 113}_0 ∧ true) 
c  in CNF:
c    -b^{2, 113}_2 ∨ -b^{2, 113}_1 ∨ -b^{2, 113}_0 ∨ false 
c  in DIMACS:
-4985 -4986 -4987  0

c i = 114
c  -2+1 --> -1
c    ( b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧  p_228) -> ( b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0)
c  in CNF:
c    -b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨  b^{2, 115}_2
c    -b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_1
c    -b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨  b^{2, 115}_0
c  in DIMACS:
-4988 -4989  4990 -228  4991 0
-4988 -4989  4990 -228 -4992 0
-4988 -4989  4990 -228  4993 0

c  -1+1 --> 0
c    ( b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0 ∧  p_228) -> (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧ -b^{2, 115}_0)
c  in CNF:
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_2
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_1
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_0
c  in DIMACS:
-4988  4989 -4990 -228 -4991 0
-4988  4989 -4990 -228 -4992 0
-4988  4989 -4990 -228 -4993 0

c  0+1 --> 1
c    (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧  p_228) -> (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0)
c  in CNF:
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_2
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_1
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨  b^{2, 115}_0
c  in DIMACS:
 4988  4989  4990 -228 -4991 0
 4988  4989  4990 -228 -4992 0
 4988  4989  4990 -228  4993 0

c  1+1 --> 2
c    (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0 ∧  p_228) -> (-b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0)
c  in CNF:
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_2
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨  b^{2, 115}_1
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ -p_228 ∨ -b^{2, 115}_0
c  in DIMACS:
 4988  4989 -4990 -228 -4991 0
 4988  4989 -4990 -228  4992 0
 4988  4989 -4990 -228 -4993 0

c  2+1 --> break 
c    (-b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧  p_228) -> break
c  in CNF:
c     b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 4988 -4989  4990 -228 1162 0


c  2-1 --> 1
c    (-b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧ -p_228) -> (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0)
c  in CNF:
c     b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_2
c     b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_1
c     b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨  b^{2, 115}_0
c  in DIMACS:
 4988 -4989  4990  228 -4991 0
 4988 -4989  4990  228 -4992 0
 4988 -4989  4990  228  4993 0

c  1-1 --> 0
c    (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0 ∧ -p_228) -> (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧ -b^{2, 115}_0)
c  in CNF:
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_2
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_1
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_0
c  in DIMACS:
 4988  4989 -4990  228 -4991 0
 4988  4989 -4990  228 -4992 0
 4988  4989 -4990  228 -4993 0

c  0-1 --> -1
c    (-b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧ -p_228) -> ( b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0)
c  in CNF:
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨  b^{2, 115}_2
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_1
c     b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨  b^{2, 115}_0
c  in DIMACS:
 4988  4989  4990  228  4991 0
 4988  4989  4990  228 -4992 0
 4988  4989  4990  228  4993 0

c  -1-1 --> -2
c    ( b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧  b^{2, 114}_0 ∧ -p_228) -> ( b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0)
c  in CNF:
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨  b^{2, 115}_2
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨  b^{2, 115}_1
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨  p_228 ∨ -b^{2, 115}_0
c  in DIMACS:
-4988  4989 -4990  228  4991 0
-4988  4989 -4990  228  4992 0
-4988  4989 -4990  228 -4993 0

c  -2-1 --> break 
c    ( b^{2, 114}_2 ∧  b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨  b^{2, 114}_0 ∨  p_228 ∨ break
c  in DIMACS:
-4988 -4989  4990  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 114}_2 ∧ -b^{2, 114}_1 ∧ -b^{2, 114}_0 ∧ true) 
c  in CNF:
c    -b^{2, 114}_2 ∨  b^{2, 114}_1 ∨  b^{2, 114}_0 ∨ false 
c  in DIMACS:
-4988  4989  4990  0

c  3 does not represent an automaton state.
c    -(-b^{2, 114}_2 ∧  b^{2, 114}_1 ∧  b^{2, 114}_0 ∧ true) 
c  in CNF:
c     b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ false 
c  in DIMACS:
 4988 -4989 -4990  0
c  -3 does not represent an automaton state.
c    -( b^{2, 114}_2 ∧  b^{2, 114}_1 ∧  b^{2, 114}_0 ∧ true) 
c  in CNF:
c    -b^{2, 114}_2 ∨ -b^{2, 114}_1 ∨ -b^{2, 114}_0 ∨ false 
c  in DIMACS:
-4988 -4989 -4990  0

c i = 115
c  -2+1 --> -1
c    ( b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧  p_230) -> ( b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0)
c  in CNF:
c    -b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨  b^{2, 116}_2
c    -b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_1
c    -b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨  b^{2, 116}_0
c  in DIMACS:
-4991 -4992  4993 -230  4994 0
-4991 -4992  4993 -230 -4995 0
-4991 -4992  4993 -230  4996 0

c  -1+1 --> 0
c    ( b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0 ∧  p_230) -> (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧ -b^{2, 116}_0)
c  in CNF:
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_2
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_1
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_0
c  in DIMACS:
-4991  4992 -4993 -230 -4994 0
-4991  4992 -4993 -230 -4995 0
-4991  4992 -4993 -230 -4996 0

c  0+1 --> 1
c    (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧  p_230) -> (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0)
c  in CNF:
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_2
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_1
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨  b^{2, 116}_0
c  in DIMACS:
 4991  4992  4993 -230 -4994 0
 4991  4992  4993 -230 -4995 0
 4991  4992  4993 -230  4996 0

c  1+1 --> 2
c    (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0 ∧  p_230) -> (-b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0)
c  in CNF:
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_2
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨  b^{2, 116}_1
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ -p_230 ∨ -b^{2, 116}_0
c  in DIMACS:
 4991  4992 -4993 -230 -4994 0
 4991  4992 -4993 -230  4995 0
 4991  4992 -4993 -230 -4996 0

c  2+1 --> break 
c    (-b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧  p_230) -> break
c  in CNF:
c     b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 4991 -4992  4993 -230 1162 0


c  2-1 --> 1
c    (-b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧ -p_230) -> (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0)
c  in CNF:
c     b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_2
c     b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_1
c     b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨  b^{2, 116}_0
c  in DIMACS:
 4991 -4992  4993  230 -4994 0
 4991 -4992  4993  230 -4995 0
 4991 -4992  4993  230  4996 0

c  1-1 --> 0
c    (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0 ∧ -p_230) -> (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧ -b^{2, 116}_0)
c  in CNF:
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_2
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_1
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_0
c  in DIMACS:
 4991  4992 -4993  230 -4994 0
 4991  4992 -4993  230 -4995 0
 4991  4992 -4993  230 -4996 0

c  0-1 --> -1
c    (-b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧ -p_230) -> ( b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0)
c  in CNF:
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨  b^{2, 116}_2
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_1
c     b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨  b^{2, 116}_0
c  in DIMACS:
 4991  4992  4993  230  4994 0
 4991  4992  4993  230 -4995 0
 4991  4992  4993  230  4996 0

c  -1-1 --> -2
c    ( b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧  b^{2, 115}_0 ∧ -p_230) -> ( b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0)
c  in CNF:
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨  b^{2, 116}_2
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨  b^{2, 116}_1
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨  p_230 ∨ -b^{2, 116}_0
c  in DIMACS:
-4991  4992 -4993  230  4994 0
-4991  4992 -4993  230  4995 0
-4991  4992 -4993  230 -4996 0

c  -2-1 --> break 
c    ( b^{2, 115}_2 ∧  b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨  b^{2, 115}_0 ∨  p_230 ∨ break
c  in DIMACS:
-4991 -4992  4993  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 115}_2 ∧ -b^{2, 115}_1 ∧ -b^{2, 115}_0 ∧ true) 
c  in CNF:
c    -b^{2, 115}_2 ∨  b^{2, 115}_1 ∨  b^{2, 115}_0 ∨ false 
c  in DIMACS:
-4991  4992  4993  0

c  3 does not represent an automaton state.
c    -(-b^{2, 115}_2 ∧  b^{2, 115}_1 ∧  b^{2, 115}_0 ∧ true) 
c  in CNF:
c     b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ false 
c  in DIMACS:
 4991 -4992 -4993  0
c  -3 does not represent an automaton state.
c    -( b^{2, 115}_2 ∧  b^{2, 115}_1 ∧  b^{2, 115}_0 ∧ true) 
c  in CNF:
c    -b^{2, 115}_2 ∨ -b^{2, 115}_1 ∨ -b^{2, 115}_0 ∨ false 
c  in DIMACS:
-4991 -4992 -4993  0

c i = 116
c  -2+1 --> -1
c    ( b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧  p_232) -> ( b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0)
c  in CNF:
c    -b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨  b^{2, 117}_2
c    -b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_1
c    -b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨  b^{2, 117}_0
c  in DIMACS:
-4994 -4995  4996 -232  4997 0
-4994 -4995  4996 -232 -4998 0
-4994 -4995  4996 -232  4999 0

c  -1+1 --> 0
c    ( b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0 ∧  p_232) -> (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧ -b^{2, 117}_0)
c  in CNF:
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_2
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_1
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_0
c  in DIMACS:
-4994  4995 -4996 -232 -4997 0
-4994  4995 -4996 -232 -4998 0
-4994  4995 -4996 -232 -4999 0

c  0+1 --> 1
c    (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧  p_232) -> (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0)
c  in CNF:
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_2
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_1
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨  b^{2, 117}_0
c  in DIMACS:
 4994  4995  4996 -232 -4997 0
 4994  4995  4996 -232 -4998 0
 4994  4995  4996 -232  4999 0

c  1+1 --> 2
c    (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0 ∧  p_232) -> (-b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0)
c  in CNF:
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_2
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨  b^{2, 117}_1
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ -p_232 ∨ -b^{2, 117}_0
c  in DIMACS:
 4994  4995 -4996 -232 -4997 0
 4994  4995 -4996 -232  4998 0
 4994  4995 -4996 -232 -4999 0

c  2+1 --> break 
c    (-b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧  p_232) -> break
c  in CNF:
c     b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 4994 -4995  4996 -232 1162 0


c  2-1 --> 1
c    (-b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧ -p_232) -> (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0)
c  in CNF:
c     b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_2
c     b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_1
c     b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨  b^{2, 117}_0
c  in DIMACS:
 4994 -4995  4996  232 -4997 0
 4994 -4995  4996  232 -4998 0
 4994 -4995  4996  232  4999 0

c  1-1 --> 0
c    (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0 ∧ -p_232) -> (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧ -b^{2, 117}_0)
c  in CNF:
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_2
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_1
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_0
c  in DIMACS:
 4994  4995 -4996  232 -4997 0
 4994  4995 -4996  232 -4998 0
 4994  4995 -4996  232 -4999 0

c  0-1 --> -1
c    (-b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧ -p_232) -> ( b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0)
c  in CNF:
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨  b^{2, 117}_2
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_1
c     b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨  b^{2, 117}_0
c  in DIMACS:
 4994  4995  4996  232  4997 0
 4994  4995  4996  232 -4998 0
 4994  4995  4996  232  4999 0

c  -1-1 --> -2
c    ( b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧  b^{2, 116}_0 ∧ -p_232) -> ( b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0)
c  in CNF:
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨  b^{2, 117}_2
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨  b^{2, 117}_1
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨  p_232 ∨ -b^{2, 117}_0
c  in DIMACS:
-4994  4995 -4996  232  4997 0
-4994  4995 -4996  232  4998 0
-4994  4995 -4996  232 -4999 0

c  -2-1 --> break 
c    ( b^{2, 116}_2 ∧  b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨  b^{2, 116}_0 ∨  p_232 ∨ break
c  in DIMACS:
-4994 -4995  4996  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 116}_2 ∧ -b^{2, 116}_1 ∧ -b^{2, 116}_0 ∧ true) 
c  in CNF:
c    -b^{2, 116}_2 ∨  b^{2, 116}_1 ∨  b^{2, 116}_0 ∨ false 
c  in DIMACS:
-4994  4995  4996  0

c  3 does not represent an automaton state.
c    -(-b^{2, 116}_2 ∧  b^{2, 116}_1 ∧  b^{2, 116}_0 ∧ true) 
c  in CNF:
c     b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ false 
c  in DIMACS:
 4994 -4995 -4996  0
c  -3 does not represent an automaton state.
c    -( b^{2, 116}_2 ∧  b^{2, 116}_1 ∧  b^{2, 116}_0 ∧ true) 
c  in CNF:
c    -b^{2, 116}_2 ∨ -b^{2, 116}_1 ∨ -b^{2, 116}_0 ∨ false 
c  in DIMACS:
-4994 -4995 -4996  0

c i = 117
c  -2+1 --> -1
c    ( b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧  p_234) -> ( b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0)
c  in CNF:
c    -b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨  b^{2, 118}_2
c    -b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_1
c    -b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨  b^{2, 118}_0
c  in DIMACS:
-4997 -4998  4999 -234  5000 0
-4997 -4998  4999 -234 -5001 0
-4997 -4998  4999 -234  5002 0

c  -1+1 --> 0
c    ( b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0 ∧  p_234) -> (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧ -b^{2, 118}_0)
c  in CNF:
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_2
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_1
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_0
c  in DIMACS:
-4997  4998 -4999 -234 -5000 0
-4997  4998 -4999 -234 -5001 0
-4997  4998 -4999 -234 -5002 0

c  0+1 --> 1
c    (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧  p_234) -> (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0)
c  in CNF:
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_2
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_1
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨  b^{2, 118}_0
c  in DIMACS:
 4997  4998  4999 -234 -5000 0
 4997  4998  4999 -234 -5001 0
 4997  4998  4999 -234  5002 0

c  1+1 --> 2
c    (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0 ∧  p_234) -> (-b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0)
c  in CNF:
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_2
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨  b^{2, 118}_1
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ -p_234 ∨ -b^{2, 118}_0
c  in DIMACS:
 4997  4998 -4999 -234 -5000 0
 4997  4998 -4999 -234  5001 0
 4997  4998 -4999 -234 -5002 0

c  2+1 --> break 
c    (-b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧  p_234) -> break
c  in CNF:
c     b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 4997 -4998  4999 -234 1162 0


c  2-1 --> 1
c    (-b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧ -p_234) -> (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0)
c  in CNF:
c     b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_2
c     b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_1
c     b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨  b^{2, 118}_0
c  in DIMACS:
 4997 -4998  4999  234 -5000 0
 4997 -4998  4999  234 -5001 0
 4997 -4998  4999  234  5002 0

c  1-1 --> 0
c    (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0 ∧ -p_234) -> (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧ -b^{2, 118}_0)
c  in CNF:
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_2
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_1
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_0
c  in DIMACS:
 4997  4998 -4999  234 -5000 0
 4997  4998 -4999  234 -5001 0
 4997  4998 -4999  234 -5002 0

c  0-1 --> -1
c    (-b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧ -p_234) -> ( b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0)
c  in CNF:
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨  b^{2, 118}_2
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_1
c     b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨  b^{2, 118}_0
c  in DIMACS:
 4997  4998  4999  234  5000 0
 4997  4998  4999  234 -5001 0
 4997  4998  4999  234  5002 0

c  -1-1 --> -2
c    ( b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧  b^{2, 117}_0 ∧ -p_234) -> ( b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0)
c  in CNF:
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨  b^{2, 118}_2
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨  b^{2, 118}_1
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨  p_234 ∨ -b^{2, 118}_0
c  in DIMACS:
-4997  4998 -4999  234  5000 0
-4997  4998 -4999  234  5001 0
-4997  4998 -4999  234 -5002 0

c  -2-1 --> break 
c    ( b^{2, 117}_2 ∧  b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨  b^{2, 117}_0 ∨  p_234 ∨ break
c  in DIMACS:
-4997 -4998  4999  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 117}_2 ∧ -b^{2, 117}_1 ∧ -b^{2, 117}_0 ∧ true) 
c  in CNF:
c    -b^{2, 117}_2 ∨  b^{2, 117}_1 ∨  b^{2, 117}_0 ∨ false 
c  in DIMACS:
-4997  4998  4999  0

c  3 does not represent an automaton state.
c    -(-b^{2, 117}_2 ∧  b^{2, 117}_1 ∧  b^{2, 117}_0 ∧ true) 
c  in CNF:
c     b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ false 
c  in DIMACS:
 4997 -4998 -4999  0
c  -3 does not represent an automaton state.
c    -( b^{2, 117}_2 ∧  b^{2, 117}_1 ∧  b^{2, 117}_0 ∧ true) 
c  in CNF:
c    -b^{2, 117}_2 ∨ -b^{2, 117}_1 ∨ -b^{2, 117}_0 ∨ false 
c  in DIMACS:
-4997 -4998 -4999  0

c i = 118
c  -2+1 --> -1
c    ( b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧  p_236) -> ( b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0)
c  in CNF:
c    -b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨  b^{2, 119}_2
c    -b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_1
c    -b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨  b^{2, 119}_0
c  in DIMACS:
-5000 -5001  5002 -236  5003 0
-5000 -5001  5002 -236 -5004 0
-5000 -5001  5002 -236  5005 0

c  -1+1 --> 0
c    ( b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0 ∧  p_236) -> (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧ -b^{2, 119}_0)
c  in CNF:
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_2
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_1
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_0
c  in DIMACS:
-5000  5001 -5002 -236 -5003 0
-5000  5001 -5002 -236 -5004 0
-5000  5001 -5002 -236 -5005 0

c  0+1 --> 1
c    (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧  p_236) -> (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0)
c  in CNF:
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_2
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_1
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨  b^{2, 119}_0
c  in DIMACS:
 5000  5001  5002 -236 -5003 0
 5000  5001  5002 -236 -5004 0
 5000  5001  5002 -236  5005 0

c  1+1 --> 2
c    (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0 ∧  p_236) -> (-b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0)
c  in CNF:
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_2
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨  b^{2, 119}_1
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ -p_236 ∨ -b^{2, 119}_0
c  in DIMACS:
 5000  5001 -5002 -236 -5003 0
 5000  5001 -5002 -236  5004 0
 5000  5001 -5002 -236 -5005 0

c  2+1 --> break 
c    (-b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧  p_236) -> break
c  in CNF:
c     b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 5000 -5001  5002 -236 1162 0


c  2-1 --> 1
c    (-b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧ -p_236) -> (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0)
c  in CNF:
c     b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_2
c     b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_1
c     b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨  b^{2, 119}_0
c  in DIMACS:
 5000 -5001  5002  236 -5003 0
 5000 -5001  5002  236 -5004 0
 5000 -5001  5002  236  5005 0

c  1-1 --> 0
c    (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0 ∧ -p_236) -> (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧ -b^{2, 119}_0)
c  in CNF:
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_2
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_1
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_0
c  in DIMACS:
 5000  5001 -5002  236 -5003 0
 5000  5001 -5002  236 -5004 0
 5000  5001 -5002  236 -5005 0

c  0-1 --> -1
c    (-b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧ -p_236) -> ( b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0)
c  in CNF:
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨  b^{2, 119}_2
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_1
c     b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨  b^{2, 119}_0
c  in DIMACS:
 5000  5001  5002  236  5003 0
 5000  5001  5002  236 -5004 0
 5000  5001  5002  236  5005 0

c  -1-1 --> -2
c    ( b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧  b^{2, 118}_0 ∧ -p_236) -> ( b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0)
c  in CNF:
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨  b^{2, 119}_2
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨  b^{2, 119}_1
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨  p_236 ∨ -b^{2, 119}_0
c  in DIMACS:
-5000  5001 -5002  236  5003 0
-5000  5001 -5002  236  5004 0
-5000  5001 -5002  236 -5005 0

c  -2-1 --> break 
c    ( b^{2, 118}_2 ∧  b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨  b^{2, 118}_0 ∨  p_236 ∨ break
c  in DIMACS:
-5000 -5001  5002  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 118}_2 ∧ -b^{2, 118}_1 ∧ -b^{2, 118}_0 ∧ true) 
c  in CNF:
c    -b^{2, 118}_2 ∨  b^{2, 118}_1 ∨  b^{2, 118}_0 ∨ false 
c  in DIMACS:
-5000  5001  5002  0

c  3 does not represent an automaton state.
c    -(-b^{2, 118}_2 ∧  b^{2, 118}_1 ∧  b^{2, 118}_0 ∧ true) 
c  in CNF:
c     b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ false 
c  in DIMACS:
 5000 -5001 -5002  0
c  -3 does not represent an automaton state.
c    -( b^{2, 118}_2 ∧  b^{2, 118}_1 ∧  b^{2, 118}_0 ∧ true) 
c  in CNF:
c    -b^{2, 118}_2 ∨ -b^{2, 118}_1 ∨ -b^{2, 118}_0 ∨ false 
c  in DIMACS:
-5000 -5001 -5002  0

c i = 119
c  -2+1 --> -1
c    ( b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧  p_238) -> ( b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0)
c  in CNF:
c    -b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨  b^{2, 120}_2
c    -b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_1
c    -b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨  b^{2, 120}_0
c  in DIMACS:
-5003 -5004  5005 -238  5006 0
-5003 -5004  5005 -238 -5007 0
-5003 -5004  5005 -238  5008 0

c  -1+1 --> 0
c    ( b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0 ∧  p_238) -> (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧ -b^{2, 120}_0)
c  in CNF:
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_2
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_1
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_0
c  in DIMACS:
-5003  5004 -5005 -238 -5006 0
-5003  5004 -5005 -238 -5007 0
-5003  5004 -5005 -238 -5008 0

c  0+1 --> 1
c    (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧  p_238) -> (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0)
c  in CNF:
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_2
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_1
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨  b^{2, 120}_0
c  in DIMACS:
 5003  5004  5005 -238 -5006 0
 5003  5004  5005 -238 -5007 0
 5003  5004  5005 -238  5008 0

c  1+1 --> 2
c    (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0 ∧  p_238) -> (-b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0)
c  in CNF:
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_2
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨  b^{2, 120}_1
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ -p_238 ∨ -b^{2, 120}_0
c  in DIMACS:
 5003  5004 -5005 -238 -5006 0
 5003  5004 -5005 -238  5007 0
 5003  5004 -5005 -238 -5008 0

c  2+1 --> break 
c    (-b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧  p_238) -> break
c  in CNF:
c     b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 5003 -5004  5005 -238 1162 0


c  2-1 --> 1
c    (-b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧ -p_238) -> (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0)
c  in CNF:
c     b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_2
c     b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_1
c     b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨  b^{2, 120}_0
c  in DIMACS:
 5003 -5004  5005  238 -5006 0
 5003 -5004  5005  238 -5007 0
 5003 -5004  5005  238  5008 0

c  1-1 --> 0
c    (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0 ∧ -p_238) -> (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧ -b^{2, 120}_0)
c  in CNF:
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_2
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_1
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_0
c  in DIMACS:
 5003  5004 -5005  238 -5006 0
 5003  5004 -5005  238 -5007 0
 5003  5004 -5005  238 -5008 0

c  0-1 --> -1
c    (-b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧ -p_238) -> ( b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0)
c  in CNF:
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨  b^{2, 120}_2
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_1
c     b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨  b^{2, 120}_0
c  in DIMACS:
 5003  5004  5005  238  5006 0
 5003  5004  5005  238 -5007 0
 5003  5004  5005  238  5008 0

c  -1-1 --> -2
c    ( b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧  b^{2, 119}_0 ∧ -p_238) -> ( b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0)
c  in CNF:
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨  b^{2, 120}_2
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨  b^{2, 120}_1
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨  p_238 ∨ -b^{2, 120}_0
c  in DIMACS:
-5003  5004 -5005  238  5006 0
-5003  5004 -5005  238  5007 0
-5003  5004 -5005  238 -5008 0

c  -2-1 --> break 
c    ( b^{2, 119}_2 ∧  b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨  b^{2, 119}_0 ∨  p_238 ∨ break
c  in DIMACS:
-5003 -5004  5005  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 119}_2 ∧ -b^{2, 119}_1 ∧ -b^{2, 119}_0 ∧ true) 
c  in CNF:
c    -b^{2, 119}_2 ∨  b^{2, 119}_1 ∨  b^{2, 119}_0 ∨ false 
c  in DIMACS:
-5003  5004  5005  0

c  3 does not represent an automaton state.
c    -(-b^{2, 119}_2 ∧  b^{2, 119}_1 ∧  b^{2, 119}_0 ∧ true) 
c  in CNF:
c     b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ false 
c  in DIMACS:
 5003 -5004 -5005  0
c  -3 does not represent an automaton state.
c    -( b^{2, 119}_2 ∧  b^{2, 119}_1 ∧  b^{2, 119}_0 ∧ true) 
c  in CNF:
c    -b^{2, 119}_2 ∨ -b^{2, 119}_1 ∨ -b^{2, 119}_0 ∨ false 
c  in DIMACS:
-5003 -5004 -5005  0

c i = 120
c  -2+1 --> -1
c    ( b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧  p_240) -> ( b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0)
c  in CNF:
c    -b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨  b^{2, 121}_2
c    -b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_1
c    -b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨  b^{2, 121}_0
c  in DIMACS:
-5006 -5007  5008 -240  5009 0
-5006 -5007  5008 -240 -5010 0
-5006 -5007  5008 -240  5011 0

c  -1+1 --> 0
c    ( b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0 ∧  p_240) -> (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧ -b^{2, 121}_0)
c  in CNF:
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_2
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_1
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_0
c  in DIMACS:
-5006  5007 -5008 -240 -5009 0
-5006  5007 -5008 -240 -5010 0
-5006  5007 -5008 -240 -5011 0

c  0+1 --> 1
c    (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧  p_240) -> (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0)
c  in CNF:
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_2
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_1
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨  b^{2, 121}_0
c  in DIMACS:
 5006  5007  5008 -240 -5009 0
 5006  5007  5008 -240 -5010 0
 5006  5007  5008 -240  5011 0

c  1+1 --> 2
c    (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0 ∧  p_240) -> (-b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0)
c  in CNF:
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_2
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨  b^{2, 121}_1
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ -p_240 ∨ -b^{2, 121}_0
c  in DIMACS:
 5006  5007 -5008 -240 -5009 0
 5006  5007 -5008 -240  5010 0
 5006  5007 -5008 -240 -5011 0

c  2+1 --> break 
c    (-b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧  p_240) -> break
c  in CNF:
c     b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 5006 -5007  5008 -240 1162 0


c  2-1 --> 1
c    (-b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧ -p_240) -> (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0)
c  in CNF:
c     b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_2
c     b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_1
c     b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨  b^{2, 121}_0
c  in DIMACS:
 5006 -5007  5008  240 -5009 0
 5006 -5007  5008  240 -5010 0
 5006 -5007  5008  240  5011 0

c  1-1 --> 0
c    (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0 ∧ -p_240) -> (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧ -b^{2, 121}_0)
c  in CNF:
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_2
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_1
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_0
c  in DIMACS:
 5006  5007 -5008  240 -5009 0
 5006  5007 -5008  240 -5010 0
 5006  5007 -5008  240 -5011 0

c  0-1 --> -1
c    (-b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧ -p_240) -> ( b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0)
c  in CNF:
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨  b^{2, 121}_2
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_1
c     b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨  b^{2, 121}_0
c  in DIMACS:
 5006  5007  5008  240  5009 0
 5006  5007  5008  240 -5010 0
 5006  5007  5008  240  5011 0

c  -1-1 --> -2
c    ( b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧  b^{2, 120}_0 ∧ -p_240) -> ( b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0)
c  in CNF:
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨  b^{2, 121}_2
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨  b^{2, 121}_1
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨  p_240 ∨ -b^{2, 121}_0
c  in DIMACS:
-5006  5007 -5008  240  5009 0
-5006  5007 -5008  240  5010 0
-5006  5007 -5008  240 -5011 0

c  -2-1 --> break 
c    ( b^{2, 120}_2 ∧  b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨  b^{2, 120}_0 ∨  p_240 ∨ break
c  in DIMACS:
-5006 -5007  5008  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 120}_2 ∧ -b^{2, 120}_1 ∧ -b^{2, 120}_0 ∧ true) 
c  in CNF:
c    -b^{2, 120}_2 ∨  b^{2, 120}_1 ∨  b^{2, 120}_0 ∨ false 
c  in DIMACS:
-5006  5007  5008  0

c  3 does not represent an automaton state.
c    -(-b^{2, 120}_2 ∧  b^{2, 120}_1 ∧  b^{2, 120}_0 ∧ true) 
c  in CNF:
c     b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ false 
c  in DIMACS:
 5006 -5007 -5008  0
c  -3 does not represent an automaton state.
c    -( b^{2, 120}_2 ∧  b^{2, 120}_1 ∧  b^{2, 120}_0 ∧ true) 
c  in CNF:
c    -b^{2, 120}_2 ∨ -b^{2, 120}_1 ∨ -b^{2, 120}_0 ∨ false 
c  in DIMACS:
-5006 -5007 -5008  0

c i = 121
c  -2+1 --> -1
c    ( b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧  p_242) -> ( b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0)
c  in CNF:
c    -b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨  b^{2, 122}_2
c    -b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_1
c    -b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨  b^{2, 122}_0
c  in DIMACS:
-5009 -5010  5011 -242  5012 0
-5009 -5010  5011 -242 -5013 0
-5009 -5010  5011 -242  5014 0

c  -1+1 --> 0
c    ( b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0 ∧  p_242) -> (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧ -b^{2, 122}_0)
c  in CNF:
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_2
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_1
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_0
c  in DIMACS:
-5009  5010 -5011 -242 -5012 0
-5009  5010 -5011 -242 -5013 0
-5009  5010 -5011 -242 -5014 0

c  0+1 --> 1
c    (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧  p_242) -> (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0)
c  in CNF:
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_2
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_1
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨  b^{2, 122}_0
c  in DIMACS:
 5009  5010  5011 -242 -5012 0
 5009  5010  5011 -242 -5013 0
 5009  5010  5011 -242  5014 0

c  1+1 --> 2
c    (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0 ∧  p_242) -> (-b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0)
c  in CNF:
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_2
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨  b^{2, 122}_1
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ -p_242 ∨ -b^{2, 122}_0
c  in DIMACS:
 5009  5010 -5011 -242 -5012 0
 5009  5010 -5011 -242  5013 0
 5009  5010 -5011 -242 -5014 0

c  2+1 --> break 
c    (-b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧  p_242) -> break
c  in CNF:
c     b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 5009 -5010  5011 -242 1162 0


c  2-1 --> 1
c    (-b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧ -p_242) -> (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0)
c  in CNF:
c     b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_2
c     b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_1
c     b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨  b^{2, 122}_0
c  in DIMACS:
 5009 -5010  5011  242 -5012 0
 5009 -5010  5011  242 -5013 0
 5009 -5010  5011  242  5014 0

c  1-1 --> 0
c    (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0 ∧ -p_242) -> (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧ -b^{2, 122}_0)
c  in CNF:
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_2
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_1
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_0
c  in DIMACS:
 5009  5010 -5011  242 -5012 0
 5009  5010 -5011  242 -5013 0
 5009  5010 -5011  242 -5014 0

c  0-1 --> -1
c    (-b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧ -p_242) -> ( b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0)
c  in CNF:
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨  b^{2, 122}_2
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_1
c     b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨  b^{2, 122}_0
c  in DIMACS:
 5009  5010  5011  242  5012 0
 5009  5010  5011  242 -5013 0
 5009  5010  5011  242  5014 0

c  -1-1 --> -2
c    ( b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧  b^{2, 121}_0 ∧ -p_242) -> ( b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0)
c  in CNF:
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨  b^{2, 122}_2
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨  b^{2, 122}_1
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨  p_242 ∨ -b^{2, 122}_0
c  in DIMACS:
-5009  5010 -5011  242  5012 0
-5009  5010 -5011  242  5013 0
-5009  5010 -5011  242 -5014 0

c  -2-1 --> break 
c    ( b^{2, 121}_2 ∧  b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨  b^{2, 121}_0 ∨  p_242 ∨ break
c  in DIMACS:
-5009 -5010  5011  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 121}_2 ∧ -b^{2, 121}_1 ∧ -b^{2, 121}_0 ∧ true) 
c  in CNF:
c    -b^{2, 121}_2 ∨  b^{2, 121}_1 ∨  b^{2, 121}_0 ∨ false 
c  in DIMACS:
-5009  5010  5011  0

c  3 does not represent an automaton state.
c    -(-b^{2, 121}_2 ∧  b^{2, 121}_1 ∧  b^{2, 121}_0 ∧ true) 
c  in CNF:
c     b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ false 
c  in DIMACS:
 5009 -5010 -5011  0
c  -3 does not represent an automaton state.
c    -( b^{2, 121}_2 ∧  b^{2, 121}_1 ∧  b^{2, 121}_0 ∧ true) 
c  in CNF:
c    -b^{2, 121}_2 ∨ -b^{2, 121}_1 ∨ -b^{2, 121}_0 ∨ false 
c  in DIMACS:
-5009 -5010 -5011  0

c i = 122
c  -2+1 --> -1
c    ( b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧  p_244) -> ( b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0)
c  in CNF:
c    -b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨  b^{2, 123}_2
c    -b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_1
c    -b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨  b^{2, 123}_0
c  in DIMACS:
-5012 -5013  5014 -244  5015 0
-5012 -5013  5014 -244 -5016 0
-5012 -5013  5014 -244  5017 0

c  -1+1 --> 0
c    ( b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0 ∧  p_244) -> (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧ -b^{2, 123}_0)
c  in CNF:
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_2
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_1
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_0
c  in DIMACS:
-5012  5013 -5014 -244 -5015 0
-5012  5013 -5014 -244 -5016 0
-5012  5013 -5014 -244 -5017 0

c  0+1 --> 1
c    (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧  p_244) -> (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0)
c  in CNF:
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_2
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_1
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨  b^{2, 123}_0
c  in DIMACS:
 5012  5013  5014 -244 -5015 0
 5012  5013  5014 -244 -5016 0
 5012  5013  5014 -244  5017 0

c  1+1 --> 2
c    (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0 ∧  p_244) -> (-b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0)
c  in CNF:
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_2
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨  b^{2, 123}_1
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ -p_244 ∨ -b^{2, 123}_0
c  in DIMACS:
 5012  5013 -5014 -244 -5015 0
 5012  5013 -5014 -244  5016 0
 5012  5013 -5014 -244 -5017 0

c  2+1 --> break 
c    (-b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧  p_244) -> break
c  in CNF:
c     b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 5012 -5013  5014 -244 1162 0


c  2-1 --> 1
c    (-b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧ -p_244) -> (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0)
c  in CNF:
c     b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_2
c     b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_1
c     b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨  b^{2, 123}_0
c  in DIMACS:
 5012 -5013  5014  244 -5015 0
 5012 -5013  5014  244 -5016 0
 5012 -5013  5014  244  5017 0

c  1-1 --> 0
c    (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0 ∧ -p_244) -> (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧ -b^{2, 123}_0)
c  in CNF:
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_2
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_1
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_0
c  in DIMACS:
 5012  5013 -5014  244 -5015 0
 5012  5013 -5014  244 -5016 0
 5012  5013 -5014  244 -5017 0

c  0-1 --> -1
c    (-b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧ -p_244) -> ( b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0)
c  in CNF:
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨  b^{2, 123}_2
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_1
c     b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨  b^{2, 123}_0
c  in DIMACS:
 5012  5013  5014  244  5015 0
 5012  5013  5014  244 -5016 0
 5012  5013  5014  244  5017 0

c  -1-1 --> -2
c    ( b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧  b^{2, 122}_0 ∧ -p_244) -> ( b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0)
c  in CNF:
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨  b^{2, 123}_2
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨  b^{2, 123}_1
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨  p_244 ∨ -b^{2, 123}_0
c  in DIMACS:
-5012  5013 -5014  244  5015 0
-5012  5013 -5014  244  5016 0
-5012  5013 -5014  244 -5017 0

c  -2-1 --> break 
c    ( b^{2, 122}_2 ∧  b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨  b^{2, 122}_0 ∨  p_244 ∨ break
c  in DIMACS:
-5012 -5013  5014  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 122}_2 ∧ -b^{2, 122}_1 ∧ -b^{2, 122}_0 ∧ true) 
c  in CNF:
c    -b^{2, 122}_2 ∨  b^{2, 122}_1 ∨  b^{2, 122}_0 ∨ false 
c  in DIMACS:
-5012  5013  5014  0

c  3 does not represent an automaton state.
c    -(-b^{2, 122}_2 ∧  b^{2, 122}_1 ∧  b^{2, 122}_0 ∧ true) 
c  in CNF:
c     b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ false 
c  in DIMACS:
 5012 -5013 -5014  0
c  -3 does not represent an automaton state.
c    -( b^{2, 122}_2 ∧  b^{2, 122}_1 ∧  b^{2, 122}_0 ∧ true) 
c  in CNF:
c    -b^{2, 122}_2 ∨ -b^{2, 122}_1 ∨ -b^{2, 122}_0 ∨ false 
c  in DIMACS:
-5012 -5013 -5014  0

c i = 123
c  -2+1 --> -1
c    ( b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧  p_246) -> ( b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0)
c  in CNF:
c    -b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨  b^{2, 124}_2
c    -b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_1
c    -b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨  b^{2, 124}_0
c  in DIMACS:
-5015 -5016  5017 -246  5018 0
-5015 -5016  5017 -246 -5019 0
-5015 -5016  5017 -246  5020 0

c  -1+1 --> 0
c    ( b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0 ∧  p_246) -> (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧ -b^{2, 124}_0)
c  in CNF:
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_2
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_1
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_0
c  in DIMACS:
-5015  5016 -5017 -246 -5018 0
-5015  5016 -5017 -246 -5019 0
-5015  5016 -5017 -246 -5020 0

c  0+1 --> 1
c    (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧  p_246) -> (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0)
c  in CNF:
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_2
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_1
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨  b^{2, 124}_0
c  in DIMACS:
 5015  5016  5017 -246 -5018 0
 5015  5016  5017 -246 -5019 0
 5015  5016  5017 -246  5020 0

c  1+1 --> 2
c    (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0 ∧  p_246) -> (-b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0)
c  in CNF:
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_2
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨  b^{2, 124}_1
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ -p_246 ∨ -b^{2, 124}_0
c  in DIMACS:
 5015  5016 -5017 -246 -5018 0
 5015  5016 -5017 -246  5019 0
 5015  5016 -5017 -246 -5020 0

c  2+1 --> break 
c    (-b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧  p_246) -> break
c  in CNF:
c     b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 5015 -5016  5017 -246 1162 0


c  2-1 --> 1
c    (-b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧ -p_246) -> (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0)
c  in CNF:
c     b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_2
c     b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_1
c     b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨  b^{2, 124}_0
c  in DIMACS:
 5015 -5016  5017  246 -5018 0
 5015 -5016  5017  246 -5019 0
 5015 -5016  5017  246  5020 0

c  1-1 --> 0
c    (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0 ∧ -p_246) -> (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧ -b^{2, 124}_0)
c  in CNF:
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_2
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_1
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_0
c  in DIMACS:
 5015  5016 -5017  246 -5018 0
 5015  5016 -5017  246 -5019 0
 5015  5016 -5017  246 -5020 0

c  0-1 --> -1
c    (-b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧ -p_246) -> ( b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0)
c  in CNF:
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨  b^{2, 124}_2
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_1
c     b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨  b^{2, 124}_0
c  in DIMACS:
 5015  5016  5017  246  5018 0
 5015  5016  5017  246 -5019 0
 5015  5016  5017  246  5020 0

c  -1-1 --> -2
c    ( b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧  b^{2, 123}_0 ∧ -p_246) -> ( b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0)
c  in CNF:
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨  b^{2, 124}_2
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨  b^{2, 124}_1
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨  p_246 ∨ -b^{2, 124}_0
c  in DIMACS:
-5015  5016 -5017  246  5018 0
-5015  5016 -5017  246  5019 0
-5015  5016 -5017  246 -5020 0

c  -2-1 --> break 
c    ( b^{2, 123}_2 ∧  b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨  b^{2, 123}_0 ∨  p_246 ∨ break
c  in DIMACS:
-5015 -5016  5017  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 123}_2 ∧ -b^{2, 123}_1 ∧ -b^{2, 123}_0 ∧ true) 
c  in CNF:
c    -b^{2, 123}_2 ∨  b^{2, 123}_1 ∨  b^{2, 123}_0 ∨ false 
c  in DIMACS:
-5015  5016  5017  0

c  3 does not represent an automaton state.
c    -(-b^{2, 123}_2 ∧  b^{2, 123}_1 ∧  b^{2, 123}_0 ∧ true) 
c  in CNF:
c     b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ false 
c  in DIMACS:
 5015 -5016 -5017  0
c  -3 does not represent an automaton state.
c    -( b^{2, 123}_2 ∧  b^{2, 123}_1 ∧  b^{2, 123}_0 ∧ true) 
c  in CNF:
c    -b^{2, 123}_2 ∨ -b^{2, 123}_1 ∨ -b^{2, 123}_0 ∨ false 
c  in DIMACS:
-5015 -5016 -5017  0

c i = 124
c  -2+1 --> -1
c    ( b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧  p_248) -> ( b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0)
c  in CNF:
c    -b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨  b^{2, 125}_2
c    -b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_1
c    -b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨  b^{2, 125}_0
c  in DIMACS:
-5018 -5019  5020 -248  5021 0
-5018 -5019  5020 -248 -5022 0
-5018 -5019  5020 -248  5023 0

c  -1+1 --> 0
c    ( b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0 ∧  p_248) -> (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧ -b^{2, 125}_0)
c  in CNF:
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_2
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_1
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_0
c  in DIMACS:
-5018  5019 -5020 -248 -5021 0
-5018  5019 -5020 -248 -5022 0
-5018  5019 -5020 -248 -5023 0

c  0+1 --> 1
c    (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧  p_248) -> (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0)
c  in CNF:
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_2
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_1
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨  b^{2, 125}_0
c  in DIMACS:
 5018  5019  5020 -248 -5021 0
 5018  5019  5020 -248 -5022 0
 5018  5019  5020 -248  5023 0

c  1+1 --> 2
c    (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0 ∧  p_248) -> (-b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0)
c  in CNF:
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_2
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨  b^{2, 125}_1
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ -p_248 ∨ -b^{2, 125}_0
c  in DIMACS:
 5018  5019 -5020 -248 -5021 0
 5018  5019 -5020 -248  5022 0
 5018  5019 -5020 -248 -5023 0

c  2+1 --> break 
c    (-b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧  p_248) -> break
c  in CNF:
c     b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 5018 -5019  5020 -248 1162 0


c  2-1 --> 1
c    (-b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧ -p_248) -> (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0)
c  in CNF:
c     b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_2
c     b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_1
c     b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨  b^{2, 125}_0
c  in DIMACS:
 5018 -5019  5020  248 -5021 0
 5018 -5019  5020  248 -5022 0
 5018 -5019  5020  248  5023 0

c  1-1 --> 0
c    (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0 ∧ -p_248) -> (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧ -b^{2, 125}_0)
c  in CNF:
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_2
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_1
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_0
c  in DIMACS:
 5018  5019 -5020  248 -5021 0
 5018  5019 -5020  248 -5022 0
 5018  5019 -5020  248 -5023 0

c  0-1 --> -1
c    (-b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧ -p_248) -> ( b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0)
c  in CNF:
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨  b^{2, 125}_2
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_1
c     b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨  b^{2, 125}_0
c  in DIMACS:
 5018  5019  5020  248  5021 0
 5018  5019  5020  248 -5022 0
 5018  5019  5020  248  5023 0

c  -1-1 --> -2
c    ( b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧  b^{2, 124}_0 ∧ -p_248) -> ( b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0)
c  in CNF:
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨  b^{2, 125}_2
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨  b^{2, 125}_1
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨  p_248 ∨ -b^{2, 125}_0
c  in DIMACS:
-5018  5019 -5020  248  5021 0
-5018  5019 -5020  248  5022 0
-5018  5019 -5020  248 -5023 0

c  -2-1 --> break 
c    ( b^{2, 124}_2 ∧  b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨  b^{2, 124}_0 ∨  p_248 ∨ break
c  in DIMACS:
-5018 -5019  5020  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 124}_2 ∧ -b^{2, 124}_1 ∧ -b^{2, 124}_0 ∧ true) 
c  in CNF:
c    -b^{2, 124}_2 ∨  b^{2, 124}_1 ∨  b^{2, 124}_0 ∨ false 
c  in DIMACS:
-5018  5019  5020  0

c  3 does not represent an automaton state.
c    -(-b^{2, 124}_2 ∧  b^{2, 124}_1 ∧  b^{2, 124}_0 ∧ true) 
c  in CNF:
c     b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ false 
c  in DIMACS:
 5018 -5019 -5020  0
c  -3 does not represent an automaton state.
c    -( b^{2, 124}_2 ∧  b^{2, 124}_1 ∧  b^{2, 124}_0 ∧ true) 
c  in CNF:
c    -b^{2, 124}_2 ∨ -b^{2, 124}_1 ∨ -b^{2, 124}_0 ∨ false 
c  in DIMACS:
-5018 -5019 -5020  0

c i = 125
c  -2+1 --> -1
c    ( b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧  p_250) -> ( b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0)
c  in CNF:
c    -b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨  b^{2, 126}_2
c    -b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_1
c    -b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨  b^{2, 126}_0
c  in DIMACS:
-5021 -5022  5023 -250  5024 0
-5021 -5022  5023 -250 -5025 0
-5021 -5022  5023 -250  5026 0

c  -1+1 --> 0
c    ( b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0 ∧  p_250) -> (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧ -b^{2, 126}_0)
c  in CNF:
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_2
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_1
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_0
c  in DIMACS:
-5021  5022 -5023 -250 -5024 0
-5021  5022 -5023 -250 -5025 0
-5021  5022 -5023 -250 -5026 0

c  0+1 --> 1
c    (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧  p_250) -> (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0)
c  in CNF:
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_2
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_1
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨  b^{2, 126}_0
c  in DIMACS:
 5021  5022  5023 -250 -5024 0
 5021  5022  5023 -250 -5025 0
 5021  5022  5023 -250  5026 0

c  1+1 --> 2
c    (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0 ∧  p_250) -> (-b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0)
c  in CNF:
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_2
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨  b^{2, 126}_1
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ -p_250 ∨ -b^{2, 126}_0
c  in DIMACS:
 5021  5022 -5023 -250 -5024 0
 5021  5022 -5023 -250  5025 0
 5021  5022 -5023 -250 -5026 0

c  2+1 --> break 
c    (-b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧  p_250) -> break
c  in CNF:
c     b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 5021 -5022  5023 -250 1162 0


c  2-1 --> 1
c    (-b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧ -p_250) -> (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0)
c  in CNF:
c     b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_2
c     b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_1
c     b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨  b^{2, 126}_0
c  in DIMACS:
 5021 -5022  5023  250 -5024 0
 5021 -5022  5023  250 -5025 0
 5021 -5022  5023  250  5026 0

c  1-1 --> 0
c    (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0 ∧ -p_250) -> (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧ -b^{2, 126}_0)
c  in CNF:
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_2
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_1
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_0
c  in DIMACS:
 5021  5022 -5023  250 -5024 0
 5021  5022 -5023  250 -5025 0
 5021  5022 -5023  250 -5026 0

c  0-1 --> -1
c    (-b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧ -p_250) -> ( b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0)
c  in CNF:
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨  b^{2, 126}_2
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_1
c     b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨  b^{2, 126}_0
c  in DIMACS:
 5021  5022  5023  250  5024 0
 5021  5022  5023  250 -5025 0
 5021  5022  5023  250  5026 0

c  -1-1 --> -2
c    ( b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧  b^{2, 125}_0 ∧ -p_250) -> ( b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0)
c  in CNF:
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨  b^{2, 126}_2
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨  b^{2, 126}_1
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨  p_250 ∨ -b^{2, 126}_0
c  in DIMACS:
-5021  5022 -5023  250  5024 0
-5021  5022 -5023  250  5025 0
-5021  5022 -5023  250 -5026 0

c  -2-1 --> break 
c    ( b^{2, 125}_2 ∧  b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨  b^{2, 125}_0 ∨  p_250 ∨ break
c  in DIMACS:
-5021 -5022  5023  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 125}_2 ∧ -b^{2, 125}_1 ∧ -b^{2, 125}_0 ∧ true) 
c  in CNF:
c    -b^{2, 125}_2 ∨  b^{2, 125}_1 ∨  b^{2, 125}_0 ∨ false 
c  in DIMACS:
-5021  5022  5023  0

c  3 does not represent an automaton state.
c    -(-b^{2, 125}_2 ∧  b^{2, 125}_1 ∧  b^{2, 125}_0 ∧ true) 
c  in CNF:
c     b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ false 
c  in DIMACS:
 5021 -5022 -5023  0
c  -3 does not represent an automaton state.
c    -( b^{2, 125}_2 ∧  b^{2, 125}_1 ∧  b^{2, 125}_0 ∧ true) 
c  in CNF:
c    -b^{2, 125}_2 ∨ -b^{2, 125}_1 ∨ -b^{2, 125}_0 ∨ false 
c  in DIMACS:
-5021 -5022 -5023  0

c i = 126
c  -2+1 --> -1
c    ( b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧  p_252) -> ( b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0)
c  in CNF:
c    -b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨  b^{2, 127}_2
c    -b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_1
c    -b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨  b^{2, 127}_0
c  in DIMACS:
-5024 -5025  5026 -252  5027 0
-5024 -5025  5026 -252 -5028 0
-5024 -5025  5026 -252  5029 0

c  -1+1 --> 0
c    ( b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0 ∧  p_252) -> (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧ -b^{2, 127}_0)
c  in CNF:
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_2
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_1
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_0
c  in DIMACS:
-5024  5025 -5026 -252 -5027 0
-5024  5025 -5026 -252 -5028 0
-5024  5025 -5026 -252 -5029 0

c  0+1 --> 1
c    (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧  p_252) -> (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0)
c  in CNF:
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_2
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_1
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨  b^{2, 127}_0
c  in DIMACS:
 5024  5025  5026 -252 -5027 0
 5024  5025  5026 -252 -5028 0
 5024  5025  5026 -252  5029 0

c  1+1 --> 2
c    (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0 ∧  p_252) -> (-b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0)
c  in CNF:
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_2
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨  b^{2, 127}_1
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ -p_252 ∨ -b^{2, 127}_0
c  in DIMACS:
 5024  5025 -5026 -252 -5027 0
 5024  5025 -5026 -252  5028 0
 5024  5025 -5026 -252 -5029 0

c  2+1 --> break 
c    (-b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧  p_252) -> break
c  in CNF:
c     b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 5024 -5025  5026 -252 1162 0


c  2-1 --> 1
c    (-b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧ -p_252) -> (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0)
c  in CNF:
c     b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_2
c     b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_1
c     b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨  b^{2, 127}_0
c  in DIMACS:
 5024 -5025  5026  252 -5027 0
 5024 -5025  5026  252 -5028 0
 5024 -5025  5026  252  5029 0

c  1-1 --> 0
c    (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0 ∧ -p_252) -> (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧ -b^{2, 127}_0)
c  in CNF:
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_2
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_1
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_0
c  in DIMACS:
 5024  5025 -5026  252 -5027 0
 5024  5025 -5026  252 -5028 0
 5024  5025 -5026  252 -5029 0

c  0-1 --> -1
c    (-b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧ -p_252) -> ( b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0)
c  in CNF:
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨  b^{2, 127}_2
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_1
c     b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨  b^{2, 127}_0
c  in DIMACS:
 5024  5025  5026  252  5027 0
 5024  5025  5026  252 -5028 0
 5024  5025  5026  252  5029 0

c  -1-1 --> -2
c    ( b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧  b^{2, 126}_0 ∧ -p_252) -> ( b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0)
c  in CNF:
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨  b^{2, 127}_2
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨  b^{2, 127}_1
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨  p_252 ∨ -b^{2, 127}_0
c  in DIMACS:
-5024  5025 -5026  252  5027 0
-5024  5025 -5026  252  5028 0
-5024  5025 -5026  252 -5029 0

c  -2-1 --> break 
c    ( b^{2, 126}_2 ∧  b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨  b^{2, 126}_0 ∨  p_252 ∨ break
c  in DIMACS:
-5024 -5025  5026  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 126}_2 ∧ -b^{2, 126}_1 ∧ -b^{2, 126}_0 ∧ true) 
c  in CNF:
c    -b^{2, 126}_2 ∨  b^{2, 126}_1 ∨  b^{2, 126}_0 ∨ false 
c  in DIMACS:
-5024  5025  5026  0

c  3 does not represent an automaton state.
c    -(-b^{2, 126}_2 ∧  b^{2, 126}_1 ∧  b^{2, 126}_0 ∧ true) 
c  in CNF:
c     b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ false 
c  in DIMACS:
 5024 -5025 -5026  0
c  -3 does not represent an automaton state.
c    -( b^{2, 126}_2 ∧  b^{2, 126}_1 ∧  b^{2, 126}_0 ∧ true) 
c  in CNF:
c    -b^{2, 126}_2 ∨ -b^{2, 126}_1 ∨ -b^{2, 126}_0 ∨ false 
c  in DIMACS:
-5024 -5025 -5026  0

c i = 127
c  -2+1 --> -1
c    ( b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧  p_254) -> ( b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0)
c  in CNF:
c    -b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨  b^{2, 128}_2
c    -b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_1
c    -b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨  b^{2, 128}_0
c  in DIMACS:
-5027 -5028  5029 -254  5030 0
-5027 -5028  5029 -254 -5031 0
-5027 -5028  5029 -254  5032 0

c  -1+1 --> 0
c    ( b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0 ∧  p_254) -> (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧ -b^{2, 128}_0)
c  in CNF:
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_2
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_1
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_0
c  in DIMACS:
-5027  5028 -5029 -254 -5030 0
-5027  5028 -5029 -254 -5031 0
-5027  5028 -5029 -254 -5032 0

c  0+1 --> 1
c    (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧  p_254) -> (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0)
c  in CNF:
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_2
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_1
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨  b^{2, 128}_0
c  in DIMACS:
 5027  5028  5029 -254 -5030 0
 5027  5028  5029 -254 -5031 0
 5027  5028  5029 -254  5032 0

c  1+1 --> 2
c    (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0 ∧  p_254) -> (-b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0)
c  in CNF:
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_2
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨  b^{2, 128}_1
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ -p_254 ∨ -b^{2, 128}_0
c  in DIMACS:
 5027  5028 -5029 -254 -5030 0
 5027  5028 -5029 -254  5031 0
 5027  5028 -5029 -254 -5032 0

c  2+1 --> break 
c    (-b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧  p_254) -> break
c  in CNF:
c     b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ -p_254 ∨ break
c  in DIMACS:
 5027 -5028  5029 -254 1162 0


c  2-1 --> 1
c    (-b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧ -p_254) -> (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0)
c  in CNF:
c     b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_2
c     b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_1
c     b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨  b^{2, 128}_0
c  in DIMACS:
 5027 -5028  5029  254 -5030 0
 5027 -5028  5029  254 -5031 0
 5027 -5028  5029  254  5032 0

c  1-1 --> 0
c    (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0 ∧ -p_254) -> (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧ -b^{2, 128}_0)
c  in CNF:
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_2
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_1
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_0
c  in DIMACS:
 5027  5028 -5029  254 -5030 0
 5027  5028 -5029  254 -5031 0
 5027  5028 -5029  254 -5032 0

c  0-1 --> -1
c    (-b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧ -p_254) -> ( b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0)
c  in CNF:
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨  b^{2, 128}_2
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_1
c     b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨  b^{2, 128}_0
c  in DIMACS:
 5027  5028  5029  254  5030 0
 5027  5028  5029  254 -5031 0
 5027  5028  5029  254  5032 0

c  -1-1 --> -2
c    ( b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧  b^{2, 127}_0 ∧ -p_254) -> ( b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0)
c  in CNF:
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨  b^{2, 128}_2
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨  b^{2, 128}_1
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨  p_254 ∨ -b^{2, 128}_0
c  in DIMACS:
-5027  5028 -5029  254  5030 0
-5027  5028 -5029  254  5031 0
-5027  5028 -5029  254 -5032 0

c  -2-1 --> break 
c    ( b^{2, 127}_2 ∧  b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧ -p_254) -> break
c  in CNF:
c    -b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨  b^{2, 127}_0 ∨  p_254 ∨ break
c  in DIMACS:
-5027 -5028  5029  254 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 127}_2 ∧ -b^{2, 127}_1 ∧ -b^{2, 127}_0 ∧ true) 
c  in CNF:
c    -b^{2, 127}_2 ∨  b^{2, 127}_1 ∨  b^{2, 127}_0 ∨ false 
c  in DIMACS:
-5027  5028  5029  0

c  3 does not represent an automaton state.
c    -(-b^{2, 127}_2 ∧  b^{2, 127}_1 ∧  b^{2, 127}_0 ∧ true) 
c  in CNF:
c     b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ false 
c  in DIMACS:
 5027 -5028 -5029  0
c  -3 does not represent an automaton state.
c    -( b^{2, 127}_2 ∧  b^{2, 127}_1 ∧  b^{2, 127}_0 ∧ true) 
c  in CNF:
c    -b^{2, 127}_2 ∨ -b^{2, 127}_1 ∨ -b^{2, 127}_0 ∨ false 
c  in DIMACS:
-5027 -5028 -5029  0

c i = 128
c  -2+1 --> -1
c    ( b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧  p_256) -> ( b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0)
c  in CNF:
c    -b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨  b^{2, 129}_2
c    -b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_1
c    -b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨  b^{2, 129}_0
c  in DIMACS:
-5030 -5031  5032 -256  5033 0
-5030 -5031  5032 -256 -5034 0
-5030 -5031  5032 -256  5035 0

c  -1+1 --> 0
c    ( b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0 ∧  p_256) -> (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧ -b^{2, 129}_0)
c  in CNF:
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_2
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_1
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_0
c  in DIMACS:
-5030  5031 -5032 -256 -5033 0
-5030  5031 -5032 -256 -5034 0
-5030  5031 -5032 -256 -5035 0

c  0+1 --> 1
c    (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧  p_256) -> (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0)
c  in CNF:
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_2
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_1
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨  b^{2, 129}_0
c  in DIMACS:
 5030  5031  5032 -256 -5033 0
 5030  5031  5032 -256 -5034 0
 5030  5031  5032 -256  5035 0

c  1+1 --> 2
c    (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0 ∧  p_256) -> (-b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0)
c  in CNF:
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_2
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨  b^{2, 129}_1
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ -p_256 ∨ -b^{2, 129}_0
c  in DIMACS:
 5030  5031 -5032 -256 -5033 0
 5030  5031 -5032 -256  5034 0
 5030  5031 -5032 -256 -5035 0

c  2+1 --> break 
c    (-b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧  p_256) -> break
c  in CNF:
c     b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 5030 -5031  5032 -256 1162 0


c  2-1 --> 1
c    (-b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧ -p_256) -> (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0)
c  in CNF:
c     b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_2
c     b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_1
c     b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨  b^{2, 129}_0
c  in DIMACS:
 5030 -5031  5032  256 -5033 0
 5030 -5031  5032  256 -5034 0
 5030 -5031  5032  256  5035 0

c  1-1 --> 0
c    (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0 ∧ -p_256) -> (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧ -b^{2, 129}_0)
c  in CNF:
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_2
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_1
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_0
c  in DIMACS:
 5030  5031 -5032  256 -5033 0
 5030  5031 -5032  256 -5034 0
 5030  5031 -5032  256 -5035 0

c  0-1 --> -1
c    (-b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧ -p_256) -> ( b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0)
c  in CNF:
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨  b^{2, 129}_2
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_1
c     b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨  b^{2, 129}_0
c  in DIMACS:
 5030  5031  5032  256  5033 0
 5030  5031  5032  256 -5034 0
 5030  5031  5032  256  5035 0

c  -1-1 --> -2
c    ( b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧  b^{2, 128}_0 ∧ -p_256) -> ( b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0)
c  in CNF:
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨  b^{2, 129}_2
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨  b^{2, 129}_1
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨  p_256 ∨ -b^{2, 129}_0
c  in DIMACS:
-5030  5031 -5032  256  5033 0
-5030  5031 -5032  256  5034 0
-5030  5031 -5032  256 -5035 0

c  -2-1 --> break 
c    ( b^{2, 128}_2 ∧  b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨  b^{2, 128}_0 ∨  p_256 ∨ break
c  in DIMACS:
-5030 -5031  5032  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 128}_2 ∧ -b^{2, 128}_1 ∧ -b^{2, 128}_0 ∧ true) 
c  in CNF:
c    -b^{2, 128}_2 ∨  b^{2, 128}_1 ∨  b^{2, 128}_0 ∨ false 
c  in DIMACS:
-5030  5031  5032  0

c  3 does not represent an automaton state.
c    -(-b^{2, 128}_2 ∧  b^{2, 128}_1 ∧  b^{2, 128}_0 ∧ true) 
c  in CNF:
c     b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ false 
c  in DIMACS:
 5030 -5031 -5032  0
c  -3 does not represent an automaton state.
c    -( b^{2, 128}_2 ∧  b^{2, 128}_1 ∧  b^{2, 128}_0 ∧ true) 
c  in CNF:
c    -b^{2, 128}_2 ∨ -b^{2, 128}_1 ∨ -b^{2, 128}_0 ∨ false 
c  in DIMACS:
-5030 -5031 -5032  0

c i = 129
c  -2+1 --> -1
c    ( b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧  p_258) -> ( b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0)
c  in CNF:
c    -b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨  b^{2, 130}_2
c    -b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_1
c    -b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨  b^{2, 130}_0
c  in DIMACS:
-5033 -5034  5035 -258  5036 0
-5033 -5034  5035 -258 -5037 0
-5033 -5034  5035 -258  5038 0

c  -1+1 --> 0
c    ( b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0 ∧  p_258) -> (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧ -b^{2, 130}_0)
c  in CNF:
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_2
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_1
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_0
c  in DIMACS:
-5033  5034 -5035 -258 -5036 0
-5033  5034 -5035 -258 -5037 0
-5033  5034 -5035 -258 -5038 0

c  0+1 --> 1
c    (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧  p_258) -> (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0)
c  in CNF:
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_2
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_1
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨  b^{2, 130}_0
c  in DIMACS:
 5033  5034  5035 -258 -5036 0
 5033  5034  5035 -258 -5037 0
 5033  5034  5035 -258  5038 0

c  1+1 --> 2
c    (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0 ∧  p_258) -> (-b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0)
c  in CNF:
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_2
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨  b^{2, 130}_1
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ -p_258 ∨ -b^{2, 130}_0
c  in DIMACS:
 5033  5034 -5035 -258 -5036 0
 5033  5034 -5035 -258  5037 0
 5033  5034 -5035 -258 -5038 0

c  2+1 --> break 
c    (-b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧  p_258) -> break
c  in CNF:
c     b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 5033 -5034  5035 -258 1162 0


c  2-1 --> 1
c    (-b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧ -p_258) -> (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0)
c  in CNF:
c     b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_2
c     b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_1
c     b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨  b^{2, 130}_0
c  in DIMACS:
 5033 -5034  5035  258 -5036 0
 5033 -5034  5035  258 -5037 0
 5033 -5034  5035  258  5038 0

c  1-1 --> 0
c    (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0 ∧ -p_258) -> (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧ -b^{2, 130}_0)
c  in CNF:
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_2
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_1
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_0
c  in DIMACS:
 5033  5034 -5035  258 -5036 0
 5033  5034 -5035  258 -5037 0
 5033  5034 -5035  258 -5038 0

c  0-1 --> -1
c    (-b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧ -p_258) -> ( b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0)
c  in CNF:
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨  b^{2, 130}_2
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_1
c     b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨  b^{2, 130}_0
c  in DIMACS:
 5033  5034  5035  258  5036 0
 5033  5034  5035  258 -5037 0
 5033  5034  5035  258  5038 0

c  -1-1 --> -2
c    ( b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧  b^{2, 129}_0 ∧ -p_258) -> ( b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0)
c  in CNF:
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨  b^{2, 130}_2
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨  b^{2, 130}_1
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨  p_258 ∨ -b^{2, 130}_0
c  in DIMACS:
-5033  5034 -5035  258  5036 0
-5033  5034 -5035  258  5037 0
-5033  5034 -5035  258 -5038 0

c  -2-1 --> break 
c    ( b^{2, 129}_2 ∧  b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨  b^{2, 129}_0 ∨  p_258 ∨ break
c  in DIMACS:
-5033 -5034  5035  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 129}_2 ∧ -b^{2, 129}_1 ∧ -b^{2, 129}_0 ∧ true) 
c  in CNF:
c    -b^{2, 129}_2 ∨  b^{2, 129}_1 ∨  b^{2, 129}_0 ∨ false 
c  in DIMACS:
-5033  5034  5035  0

c  3 does not represent an automaton state.
c    -(-b^{2, 129}_2 ∧  b^{2, 129}_1 ∧  b^{2, 129}_0 ∧ true) 
c  in CNF:
c     b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ false 
c  in DIMACS:
 5033 -5034 -5035  0
c  -3 does not represent an automaton state.
c    -( b^{2, 129}_2 ∧  b^{2, 129}_1 ∧  b^{2, 129}_0 ∧ true) 
c  in CNF:
c    -b^{2, 129}_2 ∨ -b^{2, 129}_1 ∨ -b^{2, 129}_0 ∨ false 
c  in DIMACS:
-5033 -5034 -5035  0

c i = 130
c  -2+1 --> -1
c    ( b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧  p_260) -> ( b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0)
c  in CNF:
c    -b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨  b^{2, 131}_2
c    -b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_1
c    -b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨  b^{2, 131}_0
c  in DIMACS:
-5036 -5037  5038 -260  5039 0
-5036 -5037  5038 -260 -5040 0
-5036 -5037  5038 -260  5041 0

c  -1+1 --> 0
c    ( b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0 ∧  p_260) -> (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧ -b^{2, 131}_0)
c  in CNF:
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_2
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_1
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_0
c  in DIMACS:
-5036  5037 -5038 -260 -5039 0
-5036  5037 -5038 -260 -5040 0
-5036  5037 -5038 -260 -5041 0

c  0+1 --> 1
c    (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧  p_260) -> (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0)
c  in CNF:
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_2
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_1
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨  b^{2, 131}_0
c  in DIMACS:
 5036  5037  5038 -260 -5039 0
 5036  5037  5038 -260 -5040 0
 5036  5037  5038 -260  5041 0

c  1+1 --> 2
c    (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0 ∧  p_260) -> (-b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0)
c  in CNF:
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_2
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨  b^{2, 131}_1
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ -p_260 ∨ -b^{2, 131}_0
c  in DIMACS:
 5036  5037 -5038 -260 -5039 0
 5036  5037 -5038 -260  5040 0
 5036  5037 -5038 -260 -5041 0

c  2+1 --> break 
c    (-b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧  p_260) -> break
c  in CNF:
c     b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 5036 -5037  5038 -260 1162 0


c  2-1 --> 1
c    (-b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧ -p_260) -> (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0)
c  in CNF:
c     b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_2
c     b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_1
c     b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨  b^{2, 131}_0
c  in DIMACS:
 5036 -5037  5038  260 -5039 0
 5036 -5037  5038  260 -5040 0
 5036 -5037  5038  260  5041 0

c  1-1 --> 0
c    (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0 ∧ -p_260) -> (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧ -b^{2, 131}_0)
c  in CNF:
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_2
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_1
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_0
c  in DIMACS:
 5036  5037 -5038  260 -5039 0
 5036  5037 -5038  260 -5040 0
 5036  5037 -5038  260 -5041 0

c  0-1 --> -1
c    (-b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧ -p_260) -> ( b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0)
c  in CNF:
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨  b^{2, 131}_2
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_1
c     b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨  b^{2, 131}_0
c  in DIMACS:
 5036  5037  5038  260  5039 0
 5036  5037  5038  260 -5040 0
 5036  5037  5038  260  5041 0

c  -1-1 --> -2
c    ( b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧  b^{2, 130}_0 ∧ -p_260) -> ( b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0)
c  in CNF:
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨  b^{2, 131}_2
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨  b^{2, 131}_1
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨  p_260 ∨ -b^{2, 131}_0
c  in DIMACS:
-5036  5037 -5038  260  5039 0
-5036  5037 -5038  260  5040 0
-5036  5037 -5038  260 -5041 0

c  -2-1 --> break 
c    ( b^{2, 130}_2 ∧  b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨  b^{2, 130}_0 ∨  p_260 ∨ break
c  in DIMACS:
-5036 -5037  5038  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 130}_2 ∧ -b^{2, 130}_1 ∧ -b^{2, 130}_0 ∧ true) 
c  in CNF:
c    -b^{2, 130}_2 ∨  b^{2, 130}_1 ∨  b^{2, 130}_0 ∨ false 
c  in DIMACS:
-5036  5037  5038  0

c  3 does not represent an automaton state.
c    -(-b^{2, 130}_2 ∧  b^{2, 130}_1 ∧  b^{2, 130}_0 ∧ true) 
c  in CNF:
c     b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ false 
c  in DIMACS:
 5036 -5037 -5038  0
c  -3 does not represent an automaton state.
c    -( b^{2, 130}_2 ∧  b^{2, 130}_1 ∧  b^{2, 130}_0 ∧ true) 
c  in CNF:
c    -b^{2, 130}_2 ∨ -b^{2, 130}_1 ∨ -b^{2, 130}_0 ∨ false 
c  in DIMACS:
-5036 -5037 -5038  0

c i = 131
c  -2+1 --> -1
c    ( b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧  p_262) -> ( b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0)
c  in CNF:
c    -b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨  b^{2, 132}_2
c    -b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_1
c    -b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨  b^{2, 132}_0
c  in DIMACS:
-5039 -5040  5041 -262  5042 0
-5039 -5040  5041 -262 -5043 0
-5039 -5040  5041 -262  5044 0

c  -1+1 --> 0
c    ( b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0 ∧  p_262) -> (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧ -b^{2, 132}_0)
c  in CNF:
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_2
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_1
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_0
c  in DIMACS:
-5039  5040 -5041 -262 -5042 0
-5039  5040 -5041 -262 -5043 0
-5039  5040 -5041 -262 -5044 0

c  0+1 --> 1
c    (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧  p_262) -> (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0)
c  in CNF:
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_2
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_1
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨  b^{2, 132}_0
c  in DIMACS:
 5039  5040  5041 -262 -5042 0
 5039  5040  5041 -262 -5043 0
 5039  5040  5041 -262  5044 0

c  1+1 --> 2
c    (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0 ∧  p_262) -> (-b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0)
c  in CNF:
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_2
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨  b^{2, 132}_1
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ -p_262 ∨ -b^{2, 132}_0
c  in DIMACS:
 5039  5040 -5041 -262 -5042 0
 5039  5040 -5041 -262  5043 0
 5039  5040 -5041 -262 -5044 0

c  2+1 --> break 
c    (-b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧  p_262) -> break
c  in CNF:
c     b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ -p_262 ∨ break
c  in DIMACS:
 5039 -5040  5041 -262 1162 0


c  2-1 --> 1
c    (-b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧ -p_262) -> (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0)
c  in CNF:
c     b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_2
c     b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_1
c     b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨  b^{2, 132}_0
c  in DIMACS:
 5039 -5040  5041  262 -5042 0
 5039 -5040  5041  262 -5043 0
 5039 -5040  5041  262  5044 0

c  1-1 --> 0
c    (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0 ∧ -p_262) -> (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧ -b^{2, 132}_0)
c  in CNF:
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_2
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_1
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_0
c  in DIMACS:
 5039  5040 -5041  262 -5042 0
 5039  5040 -5041  262 -5043 0
 5039  5040 -5041  262 -5044 0

c  0-1 --> -1
c    (-b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧ -p_262) -> ( b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0)
c  in CNF:
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨  b^{2, 132}_2
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_1
c     b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨  b^{2, 132}_0
c  in DIMACS:
 5039  5040  5041  262  5042 0
 5039  5040  5041  262 -5043 0
 5039  5040  5041  262  5044 0

c  -1-1 --> -2
c    ( b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧  b^{2, 131}_0 ∧ -p_262) -> ( b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0)
c  in CNF:
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨  b^{2, 132}_2
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨  b^{2, 132}_1
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨  p_262 ∨ -b^{2, 132}_0
c  in DIMACS:
-5039  5040 -5041  262  5042 0
-5039  5040 -5041  262  5043 0
-5039  5040 -5041  262 -5044 0

c  -2-1 --> break 
c    ( b^{2, 131}_2 ∧  b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧ -p_262) -> break
c  in CNF:
c    -b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨  b^{2, 131}_0 ∨  p_262 ∨ break
c  in DIMACS:
-5039 -5040  5041  262 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 131}_2 ∧ -b^{2, 131}_1 ∧ -b^{2, 131}_0 ∧ true) 
c  in CNF:
c    -b^{2, 131}_2 ∨  b^{2, 131}_1 ∨  b^{2, 131}_0 ∨ false 
c  in DIMACS:
-5039  5040  5041  0

c  3 does not represent an automaton state.
c    -(-b^{2, 131}_2 ∧  b^{2, 131}_1 ∧  b^{2, 131}_0 ∧ true) 
c  in CNF:
c     b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ false 
c  in DIMACS:
 5039 -5040 -5041  0
c  -3 does not represent an automaton state.
c    -( b^{2, 131}_2 ∧  b^{2, 131}_1 ∧  b^{2, 131}_0 ∧ true) 
c  in CNF:
c    -b^{2, 131}_2 ∨ -b^{2, 131}_1 ∨ -b^{2, 131}_0 ∨ false 
c  in DIMACS:
-5039 -5040 -5041  0

c i = 132
c  -2+1 --> -1
c    ( b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧  p_264) -> ( b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0)
c  in CNF:
c    -b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨  b^{2, 133}_2
c    -b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_1
c    -b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨  b^{2, 133}_0
c  in DIMACS:
-5042 -5043  5044 -264  5045 0
-5042 -5043  5044 -264 -5046 0
-5042 -5043  5044 -264  5047 0

c  -1+1 --> 0
c    ( b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0 ∧  p_264) -> (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧ -b^{2, 133}_0)
c  in CNF:
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_2
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_1
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_0
c  in DIMACS:
-5042  5043 -5044 -264 -5045 0
-5042  5043 -5044 -264 -5046 0
-5042  5043 -5044 -264 -5047 0

c  0+1 --> 1
c    (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧  p_264) -> (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0)
c  in CNF:
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_2
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_1
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨  b^{2, 133}_0
c  in DIMACS:
 5042  5043  5044 -264 -5045 0
 5042  5043  5044 -264 -5046 0
 5042  5043  5044 -264  5047 0

c  1+1 --> 2
c    (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0 ∧  p_264) -> (-b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0)
c  in CNF:
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_2
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨  b^{2, 133}_1
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ -p_264 ∨ -b^{2, 133}_0
c  in DIMACS:
 5042  5043 -5044 -264 -5045 0
 5042  5043 -5044 -264  5046 0
 5042  5043 -5044 -264 -5047 0

c  2+1 --> break 
c    (-b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧  p_264) -> break
c  in CNF:
c     b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 5042 -5043  5044 -264 1162 0


c  2-1 --> 1
c    (-b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧ -p_264) -> (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0)
c  in CNF:
c     b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_2
c     b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_1
c     b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨  b^{2, 133}_0
c  in DIMACS:
 5042 -5043  5044  264 -5045 0
 5042 -5043  5044  264 -5046 0
 5042 -5043  5044  264  5047 0

c  1-1 --> 0
c    (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0 ∧ -p_264) -> (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧ -b^{2, 133}_0)
c  in CNF:
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_2
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_1
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_0
c  in DIMACS:
 5042  5043 -5044  264 -5045 0
 5042  5043 -5044  264 -5046 0
 5042  5043 -5044  264 -5047 0

c  0-1 --> -1
c    (-b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧ -p_264) -> ( b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0)
c  in CNF:
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨  b^{2, 133}_2
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_1
c     b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨  b^{2, 133}_0
c  in DIMACS:
 5042  5043  5044  264  5045 0
 5042  5043  5044  264 -5046 0
 5042  5043  5044  264  5047 0

c  -1-1 --> -2
c    ( b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧  b^{2, 132}_0 ∧ -p_264) -> ( b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0)
c  in CNF:
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨  b^{2, 133}_2
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨  b^{2, 133}_1
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨  p_264 ∨ -b^{2, 133}_0
c  in DIMACS:
-5042  5043 -5044  264  5045 0
-5042  5043 -5044  264  5046 0
-5042  5043 -5044  264 -5047 0

c  -2-1 --> break 
c    ( b^{2, 132}_2 ∧  b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨  b^{2, 132}_0 ∨  p_264 ∨ break
c  in DIMACS:
-5042 -5043  5044  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 132}_2 ∧ -b^{2, 132}_1 ∧ -b^{2, 132}_0 ∧ true) 
c  in CNF:
c    -b^{2, 132}_2 ∨  b^{2, 132}_1 ∨  b^{2, 132}_0 ∨ false 
c  in DIMACS:
-5042  5043  5044  0

c  3 does not represent an automaton state.
c    -(-b^{2, 132}_2 ∧  b^{2, 132}_1 ∧  b^{2, 132}_0 ∧ true) 
c  in CNF:
c     b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ false 
c  in DIMACS:
 5042 -5043 -5044  0
c  -3 does not represent an automaton state.
c    -( b^{2, 132}_2 ∧  b^{2, 132}_1 ∧  b^{2, 132}_0 ∧ true) 
c  in CNF:
c    -b^{2, 132}_2 ∨ -b^{2, 132}_1 ∨ -b^{2, 132}_0 ∨ false 
c  in DIMACS:
-5042 -5043 -5044  0

c i = 133
c  -2+1 --> -1
c    ( b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧  p_266) -> ( b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0)
c  in CNF:
c    -b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨  b^{2, 134}_2
c    -b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_1
c    -b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨  b^{2, 134}_0
c  in DIMACS:
-5045 -5046  5047 -266  5048 0
-5045 -5046  5047 -266 -5049 0
-5045 -5046  5047 -266  5050 0

c  -1+1 --> 0
c    ( b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0 ∧  p_266) -> (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧ -b^{2, 134}_0)
c  in CNF:
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_2
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_1
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_0
c  in DIMACS:
-5045  5046 -5047 -266 -5048 0
-5045  5046 -5047 -266 -5049 0
-5045  5046 -5047 -266 -5050 0

c  0+1 --> 1
c    (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧  p_266) -> (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0)
c  in CNF:
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_2
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_1
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨  b^{2, 134}_0
c  in DIMACS:
 5045  5046  5047 -266 -5048 0
 5045  5046  5047 -266 -5049 0
 5045  5046  5047 -266  5050 0

c  1+1 --> 2
c    (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0 ∧  p_266) -> (-b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0)
c  in CNF:
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_2
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨  b^{2, 134}_1
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ -p_266 ∨ -b^{2, 134}_0
c  in DIMACS:
 5045  5046 -5047 -266 -5048 0
 5045  5046 -5047 -266  5049 0
 5045  5046 -5047 -266 -5050 0

c  2+1 --> break 
c    (-b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧  p_266) -> break
c  in CNF:
c     b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 5045 -5046  5047 -266 1162 0


c  2-1 --> 1
c    (-b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧ -p_266) -> (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0)
c  in CNF:
c     b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_2
c     b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_1
c     b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨  b^{2, 134}_0
c  in DIMACS:
 5045 -5046  5047  266 -5048 0
 5045 -5046  5047  266 -5049 0
 5045 -5046  5047  266  5050 0

c  1-1 --> 0
c    (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0 ∧ -p_266) -> (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧ -b^{2, 134}_0)
c  in CNF:
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_2
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_1
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_0
c  in DIMACS:
 5045  5046 -5047  266 -5048 0
 5045  5046 -5047  266 -5049 0
 5045  5046 -5047  266 -5050 0

c  0-1 --> -1
c    (-b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧ -p_266) -> ( b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0)
c  in CNF:
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨  b^{2, 134}_2
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_1
c     b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨  b^{2, 134}_0
c  in DIMACS:
 5045  5046  5047  266  5048 0
 5045  5046  5047  266 -5049 0
 5045  5046  5047  266  5050 0

c  -1-1 --> -2
c    ( b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧  b^{2, 133}_0 ∧ -p_266) -> ( b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0)
c  in CNF:
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨  b^{2, 134}_2
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨  b^{2, 134}_1
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨  p_266 ∨ -b^{2, 134}_0
c  in DIMACS:
-5045  5046 -5047  266  5048 0
-5045  5046 -5047  266  5049 0
-5045  5046 -5047  266 -5050 0

c  -2-1 --> break 
c    ( b^{2, 133}_2 ∧  b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨  b^{2, 133}_0 ∨  p_266 ∨ break
c  in DIMACS:
-5045 -5046  5047  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 133}_2 ∧ -b^{2, 133}_1 ∧ -b^{2, 133}_0 ∧ true) 
c  in CNF:
c    -b^{2, 133}_2 ∨  b^{2, 133}_1 ∨  b^{2, 133}_0 ∨ false 
c  in DIMACS:
-5045  5046  5047  0

c  3 does not represent an automaton state.
c    -(-b^{2, 133}_2 ∧  b^{2, 133}_1 ∧  b^{2, 133}_0 ∧ true) 
c  in CNF:
c     b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ false 
c  in DIMACS:
 5045 -5046 -5047  0
c  -3 does not represent an automaton state.
c    -( b^{2, 133}_2 ∧  b^{2, 133}_1 ∧  b^{2, 133}_0 ∧ true) 
c  in CNF:
c    -b^{2, 133}_2 ∨ -b^{2, 133}_1 ∨ -b^{2, 133}_0 ∨ false 
c  in DIMACS:
-5045 -5046 -5047  0

c i = 134
c  -2+1 --> -1
c    ( b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧  p_268) -> ( b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0)
c  in CNF:
c    -b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨  b^{2, 135}_2
c    -b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_1
c    -b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨  b^{2, 135}_0
c  in DIMACS:
-5048 -5049  5050 -268  5051 0
-5048 -5049  5050 -268 -5052 0
-5048 -5049  5050 -268  5053 0

c  -1+1 --> 0
c    ( b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0 ∧  p_268) -> (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧ -b^{2, 135}_0)
c  in CNF:
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_2
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_1
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_0
c  in DIMACS:
-5048  5049 -5050 -268 -5051 0
-5048  5049 -5050 -268 -5052 0
-5048  5049 -5050 -268 -5053 0

c  0+1 --> 1
c    (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧  p_268) -> (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0)
c  in CNF:
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_2
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_1
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨  b^{2, 135}_0
c  in DIMACS:
 5048  5049  5050 -268 -5051 0
 5048  5049  5050 -268 -5052 0
 5048  5049  5050 -268  5053 0

c  1+1 --> 2
c    (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0 ∧  p_268) -> (-b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0)
c  in CNF:
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_2
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨  b^{2, 135}_1
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ -p_268 ∨ -b^{2, 135}_0
c  in DIMACS:
 5048  5049 -5050 -268 -5051 0
 5048  5049 -5050 -268  5052 0
 5048  5049 -5050 -268 -5053 0

c  2+1 --> break 
c    (-b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧  p_268) -> break
c  in CNF:
c     b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 5048 -5049  5050 -268 1162 0


c  2-1 --> 1
c    (-b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧ -p_268) -> (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0)
c  in CNF:
c     b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_2
c     b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_1
c     b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨  b^{2, 135}_0
c  in DIMACS:
 5048 -5049  5050  268 -5051 0
 5048 -5049  5050  268 -5052 0
 5048 -5049  5050  268  5053 0

c  1-1 --> 0
c    (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0 ∧ -p_268) -> (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧ -b^{2, 135}_0)
c  in CNF:
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_2
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_1
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_0
c  in DIMACS:
 5048  5049 -5050  268 -5051 0
 5048  5049 -5050  268 -5052 0
 5048  5049 -5050  268 -5053 0

c  0-1 --> -1
c    (-b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧ -p_268) -> ( b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0)
c  in CNF:
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨  b^{2, 135}_2
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_1
c     b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨  b^{2, 135}_0
c  in DIMACS:
 5048  5049  5050  268  5051 0
 5048  5049  5050  268 -5052 0
 5048  5049  5050  268  5053 0

c  -1-1 --> -2
c    ( b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧  b^{2, 134}_0 ∧ -p_268) -> ( b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0)
c  in CNF:
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨  b^{2, 135}_2
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨  b^{2, 135}_1
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨  p_268 ∨ -b^{2, 135}_0
c  in DIMACS:
-5048  5049 -5050  268  5051 0
-5048  5049 -5050  268  5052 0
-5048  5049 -5050  268 -5053 0

c  -2-1 --> break 
c    ( b^{2, 134}_2 ∧  b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨  b^{2, 134}_0 ∨  p_268 ∨ break
c  in DIMACS:
-5048 -5049  5050  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 134}_2 ∧ -b^{2, 134}_1 ∧ -b^{2, 134}_0 ∧ true) 
c  in CNF:
c    -b^{2, 134}_2 ∨  b^{2, 134}_1 ∨  b^{2, 134}_0 ∨ false 
c  in DIMACS:
-5048  5049  5050  0

c  3 does not represent an automaton state.
c    -(-b^{2, 134}_2 ∧  b^{2, 134}_1 ∧  b^{2, 134}_0 ∧ true) 
c  in CNF:
c     b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ false 
c  in DIMACS:
 5048 -5049 -5050  0
c  -3 does not represent an automaton state.
c    -( b^{2, 134}_2 ∧  b^{2, 134}_1 ∧  b^{2, 134}_0 ∧ true) 
c  in CNF:
c    -b^{2, 134}_2 ∨ -b^{2, 134}_1 ∨ -b^{2, 134}_0 ∨ false 
c  in DIMACS:
-5048 -5049 -5050  0

c i = 135
c  -2+1 --> -1
c    ( b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧  p_270) -> ( b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0)
c  in CNF:
c    -b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨  b^{2, 136}_2
c    -b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_1
c    -b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨  b^{2, 136}_0
c  in DIMACS:
-5051 -5052  5053 -270  5054 0
-5051 -5052  5053 -270 -5055 0
-5051 -5052  5053 -270  5056 0

c  -1+1 --> 0
c    ( b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0 ∧  p_270) -> (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧ -b^{2, 136}_0)
c  in CNF:
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_2
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_1
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_0
c  in DIMACS:
-5051  5052 -5053 -270 -5054 0
-5051  5052 -5053 -270 -5055 0
-5051  5052 -5053 -270 -5056 0

c  0+1 --> 1
c    (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧  p_270) -> (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0)
c  in CNF:
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_2
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_1
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨  b^{2, 136}_0
c  in DIMACS:
 5051  5052  5053 -270 -5054 0
 5051  5052  5053 -270 -5055 0
 5051  5052  5053 -270  5056 0

c  1+1 --> 2
c    (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0 ∧  p_270) -> (-b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0)
c  in CNF:
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_2
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨  b^{2, 136}_1
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ -p_270 ∨ -b^{2, 136}_0
c  in DIMACS:
 5051  5052 -5053 -270 -5054 0
 5051  5052 -5053 -270  5055 0
 5051  5052 -5053 -270 -5056 0

c  2+1 --> break 
c    (-b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧  p_270) -> break
c  in CNF:
c     b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 5051 -5052  5053 -270 1162 0


c  2-1 --> 1
c    (-b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧ -p_270) -> (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0)
c  in CNF:
c     b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_2
c     b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_1
c     b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨  b^{2, 136}_0
c  in DIMACS:
 5051 -5052  5053  270 -5054 0
 5051 -5052  5053  270 -5055 0
 5051 -5052  5053  270  5056 0

c  1-1 --> 0
c    (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0 ∧ -p_270) -> (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧ -b^{2, 136}_0)
c  in CNF:
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_2
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_1
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_0
c  in DIMACS:
 5051  5052 -5053  270 -5054 0
 5051  5052 -5053  270 -5055 0
 5051  5052 -5053  270 -5056 0

c  0-1 --> -1
c    (-b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧ -p_270) -> ( b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0)
c  in CNF:
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨  b^{2, 136}_2
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_1
c     b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨  b^{2, 136}_0
c  in DIMACS:
 5051  5052  5053  270  5054 0
 5051  5052  5053  270 -5055 0
 5051  5052  5053  270  5056 0

c  -1-1 --> -2
c    ( b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧  b^{2, 135}_0 ∧ -p_270) -> ( b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0)
c  in CNF:
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨  b^{2, 136}_2
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨  b^{2, 136}_1
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨  p_270 ∨ -b^{2, 136}_0
c  in DIMACS:
-5051  5052 -5053  270  5054 0
-5051  5052 -5053  270  5055 0
-5051  5052 -5053  270 -5056 0

c  -2-1 --> break 
c    ( b^{2, 135}_2 ∧  b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨  b^{2, 135}_0 ∨  p_270 ∨ break
c  in DIMACS:
-5051 -5052  5053  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 135}_2 ∧ -b^{2, 135}_1 ∧ -b^{2, 135}_0 ∧ true) 
c  in CNF:
c    -b^{2, 135}_2 ∨  b^{2, 135}_1 ∨  b^{2, 135}_0 ∨ false 
c  in DIMACS:
-5051  5052  5053  0

c  3 does not represent an automaton state.
c    -(-b^{2, 135}_2 ∧  b^{2, 135}_1 ∧  b^{2, 135}_0 ∧ true) 
c  in CNF:
c     b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ false 
c  in DIMACS:
 5051 -5052 -5053  0
c  -3 does not represent an automaton state.
c    -( b^{2, 135}_2 ∧  b^{2, 135}_1 ∧  b^{2, 135}_0 ∧ true) 
c  in CNF:
c    -b^{2, 135}_2 ∨ -b^{2, 135}_1 ∨ -b^{2, 135}_0 ∨ false 
c  in DIMACS:
-5051 -5052 -5053  0

c i = 136
c  -2+1 --> -1
c    ( b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧  p_272) -> ( b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0)
c  in CNF:
c    -b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨  b^{2, 137}_2
c    -b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_1
c    -b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨  b^{2, 137}_0
c  in DIMACS:
-5054 -5055  5056 -272  5057 0
-5054 -5055  5056 -272 -5058 0
-5054 -5055  5056 -272  5059 0

c  -1+1 --> 0
c    ( b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0 ∧  p_272) -> (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧ -b^{2, 137}_0)
c  in CNF:
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_2
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_1
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_0
c  in DIMACS:
-5054  5055 -5056 -272 -5057 0
-5054  5055 -5056 -272 -5058 0
-5054  5055 -5056 -272 -5059 0

c  0+1 --> 1
c    (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧  p_272) -> (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0)
c  in CNF:
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_2
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_1
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨  b^{2, 137}_0
c  in DIMACS:
 5054  5055  5056 -272 -5057 0
 5054  5055  5056 -272 -5058 0
 5054  5055  5056 -272  5059 0

c  1+1 --> 2
c    (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0 ∧  p_272) -> (-b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0)
c  in CNF:
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_2
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨  b^{2, 137}_1
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ -p_272 ∨ -b^{2, 137}_0
c  in DIMACS:
 5054  5055 -5056 -272 -5057 0
 5054  5055 -5056 -272  5058 0
 5054  5055 -5056 -272 -5059 0

c  2+1 --> break 
c    (-b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧  p_272) -> break
c  in CNF:
c     b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 5054 -5055  5056 -272 1162 0


c  2-1 --> 1
c    (-b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧ -p_272) -> (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0)
c  in CNF:
c     b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_2
c     b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_1
c     b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨  b^{2, 137}_0
c  in DIMACS:
 5054 -5055  5056  272 -5057 0
 5054 -5055  5056  272 -5058 0
 5054 -5055  5056  272  5059 0

c  1-1 --> 0
c    (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0 ∧ -p_272) -> (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧ -b^{2, 137}_0)
c  in CNF:
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_2
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_1
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_0
c  in DIMACS:
 5054  5055 -5056  272 -5057 0
 5054  5055 -5056  272 -5058 0
 5054  5055 -5056  272 -5059 0

c  0-1 --> -1
c    (-b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧ -p_272) -> ( b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0)
c  in CNF:
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨  b^{2, 137}_2
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_1
c     b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨  b^{2, 137}_0
c  in DIMACS:
 5054  5055  5056  272  5057 0
 5054  5055  5056  272 -5058 0
 5054  5055  5056  272  5059 0

c  -1-1 --> -2
c    ( b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧  b^{2, 136}_0 ∧ -p_272) -> ( b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0)
c  in CNF:
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨  b^{2, 137}_2
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨  b^{2, 137}_1
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨  p_272 ∨ -b^{2, 137}_0
c  in DIMACS:
-5054  5055 -5056  272  5057 0
-5054  5055 -5056  272  5058 0
-5054  5055 -5056  272 -5059 0

c  -2-1 --> break 
c    ( b^{2, 136}_2 ∧  b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨  b^{2, 136}_0 ∨  p_272 ∨ break
c  in DIMACS:
-5054 -5055  5056  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 136}_2 ∧ -b^{2, 136}_1 ∧ -b^{2, 136}_0 ∧ true) 
c  in CNF:
c    -b^{2, 136}_2 ∨  b^{2, 136}_1 ∨  b^{2, 136}_0 ∨ false 
c  in DIMACS:
-5054  5055  5056  0

c  3 does not represent an automaton state.
c    -(-b^{2, 136}_2 ∧  b^{2, 136}_1 ∧  b^{2, 136}_0 ∧ true) 
c  in CNF:
c     b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ false 
c  in DIMACS:
 5054 -5055 -5056  0
c  -3 does not represent an automaton state.
c    -( b^{2, 136}_2 ∧  b^{2, 136}_1 ∧  b^{2, 136}_0 ∧ true) 
c  in CNF:
c    -b^{2, 136}_2 ∨ -b^{2, 136}_1 ∨ -b^{2, 136}_0 ∨ false 
c  in DIMACS:
-5054 -5055 -5056  0

c i = 137
c  -2+1 --> -1
c    ( b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧  p_274) -> ( b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0)
c  in CNF:
c    -b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨  b^{2, 138}_2
c    -b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_1
c    -b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨  b^{2, 138}_0
c  in DIMACS:
-5057 -5058  5059 -274  5060 0
-5057 -5058  5059 -274 -5061 0
-5057 -5058  5059 -274  5062 0

c  -1+1 --> 0
c    ( b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0 ∧  p_274) -> (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧ -b^{2, 138}_0)
c  in CNF:
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_2
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_1
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_0
c  in DIMACS:
-5057  5058 -5059 -274 -5060 0
-5057  5058 -5059 -274 -5061 0
-5057  5058 -5059 -274 -5062 0

c  0+1 --> 1
c    (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧  p_274) -> (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0)
c  in CNF:
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_2
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_1
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨  b^{2, 138}_0
c  in DIMACS:
 5057  5058  5059 -274 -5060 0
 5057  5058  5059 -274 -5061 0
 5057  5058  5059 -274  5062 0

c  1+1 --> 2
c    (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0 ∧  p_274) -> (-b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0)
c  in CNF:
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_2
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨  b^{2, 138}_1
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ -p_274 ∨ -b^{2, 138}_0
c  in DIMACS:
 5057  5058 -5059 -274 -5060 0
 5057  5058 -5059 -274  5061 0
 5057  5058 -5059 -274 -5062 0

c  2+1 --> break 
c    (-b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧  p_274) -> break
c  in CNF:
c     b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ -p_274 ∨ break
c  in DIMACS:
 5057 -5058  5059 -274 1162 0


c  2-1 --> 1
c    (-b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧ -p_274) -> (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0)
c  in CNF:
c     b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_2
c     b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_1
c     b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨  b^{2, 138}_0
c  in DIMACS:
 5057 -5058  5059  274 -5060 0
 5057 -5058  5059  274 -5061 0
 5057 -5058  5059  274  5062 0

c  1-1 --> 0
c    (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0 ∧ -p_274) -> (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧ -b^{2, 138}_0)
c  in CNF:
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_2
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_1
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_0
c  in DIMACS:
 5057  5058 -5059  274 -5060 0
 5057  5058 -5059  274 -5061 0
 5057  5058 -5059  274 -5062 0

c  0-1 --> -1
c    (-b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧ -p_274) -> ( b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0)
c  in CNF:
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨  b^{2, 138}_2
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_1
c     b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨  b^{2, 138}_0
c  in DIMACS:
 5057  5058  5059  274  5060 0
 5057  5058  5059  274 -5061 0
 5057  5058  5059  274  5062 0

c  -1-1 --> -2
c    ( b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧  b^{2, 137}_0 ∧ -p_274) -> ( b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0)
c  in CNF:
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨  b^{2, 138}_2
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨  b^{2, 138}_1
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨  p_274 ∨ -b^{2, 138}_0
c  in DIMACS:
-5057  5058 -5059  274  5060 0
-5057  5058 -5059  274  5061 0
-5057  5058 -5059  274 -5062 0

c  -2-1 --> break 
c    ( b^{2, 137}_2 ∧  b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧ -p_274) -> break
c  in CNF:
c    -b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨  b^{2, 137}_0 ∨  p_274 ∨ break
c  in DIMACS:
-5057 -5058  5059  274 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 137}_2 ∧ -b^{2, 137}_1 ∧ -b^{2, 137}_0 ∧ true) 
c  in CNF:
c    -b^{2, 137}_2 ∨  b^{2, 137}_1 ∨  b^{2, 137}_0 ∨ false 
c  in DIMACS:
-5057  5058  5059  0

c  3 does not represent an automaton state.
c    -(-b^{2, 137}_2 ∧  b^{2, 137}_1 ∧  b^{2, 137}_0 ∧ true) 
c  in CNF:
c     b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ false 
c  in DIMACS:
 5057 -5058 -5059  0
c  -3 does not represent an automaton state.
c    -( b^{2, 137}_2 ∧  b^{2, 137}_1 ∧  b^{2, 137}_0 ∧ true) 
c  in CNF:
c    -b^{2, 137}_2 ∨ -b^{2, 137}_1 ∨ -b^{2, 137}_0 ∨ false 
c  in DIMACS:
-5057 -5058 -5059  0

c i = 138
c  -2+1 --> -1
c    ( b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧  p_276) -> ( b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0)
c  in CNF:
c    -b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨  b^{2, 139}_2
c    -b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_1
c    -b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨  b^{2, 139}_0
c  in DIMACS:
-5060 -5061  5062 -276  5063 0
-5060 -5061  5062 -276 -5064 0
-5060 -5061  5062 -276  5065 0

c  -1+1 --> 0
c    ( b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0 ∧  p_276) -> (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧ -b^{2, 139}_0)
c  in CNF:
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_2
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_1
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_0
c  in DIMACS:
-5060  5061 -5062 -276 -5063 0
-5060  5061 -5062 -276 -5064 0
-5060  5061 -5062 -276 -5065 0

c  0+1 --> 1
c    (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧  p_276) -> (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0)
c  in CNF:
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_2
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_1
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨  b^{2, 139}_0
c  in DIMACS:
 5060  5061  5062 -276 -5063 0
 5060  5061  5062 -276 -5064 0
 5060  5061  5062 -276  5065 0

c  1+1 --> 2
c    (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0 ∧  p_276) -> (-b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0)
c  in CNF:
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_2
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨  b^{2, 139}_1
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ -p_276 ∨ -b^{2, 139}_0
c  in DIMACS:
 5060  5061 -5062 -276 -5063 0
 5060  5061 -5062 -276  5064 0
 5060  5061 -5062 -276 -5065 0

c  2+1 --> break 
c    (-b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧  p_276) -> break
c  in CNF:
c     b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 5060 -5061  5062 -276 1162 0


c  2-1 --> 1
c    (-b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧ -p_276) -> (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0)
c  in CNF:
c     b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_2
c     b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_1
c     b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨  b^{2, 139}_0
c  in DIMACS:
 5060 -5061  5062  276 -5063 0
 5060 -5061  5062  276 -5064 0
 5060 -5061  5062  276  5065 0

c  1-1 --> 0
c    (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0 ∧ -p_276) -> (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧ -b^{2, 139}_0)
c  in CNF:
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_2
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_1
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_0
c  in DIMACS:
 5060  5061 -5062  276 -5063 0
 5060  5061 -5062  276 -5064 0
 5060  5061 -5062  276 -5065 0

c  0-1 --> -1
c    (-b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧ -p_276) -> ( b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0)
c  in CNF:
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨  b^{2, 139}_2
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_1
c     b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨  b^{2, 139}_0
c  in DIMACS:
 5060  5061  5062  276  5063 0
 5060  5061  5062  276 -5064 0
 5060  5061  5062  276  5065 0

c  -1-1 --> -2
c    ( b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧  b^{2, 138}_0 ∧ -p_276) -> ( b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0)
c  in CNF:
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨  b^{2, 139}_2
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨  b^{2, 139}_1
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨  p_276 ∨ -b^{2, 139}_0
c  in DIMACS:
-5060  5061 -5062  276  5063 0
-5060  5061 -5062  276  5064 0
-5060  5061 -5062  276 -5065 0

c  -2-1 --> break 
c    ( b^{2, 138}_2 ∧  b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨  b^{2, 138}_0 ∨  p_276 ∨ break
c  in DIMACS:
-5060 -5061  5062  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 138}_2 ∧ -b^{2, 138}_1 ∧ -b^{2, 138}_0 ∧ true) 
c  in CNF:
c    -b^{2, 138}_2 ∨  b^{2, 138}_1 ∨  b^{2, 138}_0 ∨ false 
c  in DIMACS:
-5060  5061  5062  0

c  3 does not represent an automaton state.
c    -(-b^{2, 138}_2 ∧  b^{2, 138}_1 ∧  b^{2, 138}_0 ∧ true) 
c  in CNF:
c     b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ false 
c  in DIMACS:
 5060 -5061 -5062  0
c  -3 does not represent an automaton state.
c    -( b^{2, 138}_2 ∧  b^{2, 138}_1 ∧  b^{2, 138}_0 ∧ true) 
c  in CNF:
c    -b^{2, 138}_2 ∨ -b^{2, 138}_1 ∨ -b^{2, 138}_0 ∨ false 
c  in DIMACS:
-5060 -5061 -5062  0

c i = 139
c  -2+1 --> -1
c    ( b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧  p_278) -> ( b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0)
c  in CNF:
c    -b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨  b^{2, 140}_2
c    -b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_1
c    -b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨  b^{2, 140}_0
c  in DIMACS:
-5063 -5064  5065 -278  5066 0
-5063 -5064  5065 -278 -5067 0
-5063 -5064  5065 -278  5068 0

c  -1+1 --> 0
c    ( b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0 ∧  p_278) -> (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧ -b^{2, 140}_0)
c  in CNF:
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_2
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_1
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_0
c  in DIMACS:
-5063  5064 -5065 -278 -5066 0
-5063  5064 -5065 -278 -5067 0
-5063  5064 -5065 -278 -5068 0

c  0+1 --> 1
c    (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧  p_278) -> (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0)
c  in CNF:
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_2
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_1
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨  b^{2, 140}_0
c  in DIMACS:
 5063  5064  5065 -278 -5066 0
 5063  5064  5065 -278 -5067 0
 5063  5064  5065 -278  5068 0

c  1+1 --> 2
c    (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0 ∧  p_278) -> (-b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0)
c  in CNF:
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_2
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨  b^{2, 140}_1
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ -p_278 ∨ -b^{2, 140}_0
c  in DIMACS:
 5063  5064 -5065 -278 -5066 0
 5063  5064 -5065 -278  5067 0
 5063  5064 -5065 -278 -5068 0

c  2+1 --> break 
c    (-b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧  p_278) -> break
c  in CNF:
c     b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ -p_278 ∨ break
c  in DIMACS:
 5063 -5064  5065 -278 1162 0


c  2-1 --> 1
c    (-b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧ -p_278) -> (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0)
c  in CNF:
c     b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_2
c     b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_1
c     b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨  b^{2, 140}_0
c  in DIMACS:
 5063 -5064  5065  278 -5066 0
 5063 -5064  5065  278 -5067 0
 5063 -5064  5065  278  5068 0

c  1-1 --> 0
c    (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0 ∧ -p_278) -> (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧ -b^{2, 140}_0)
c  in CNF:
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_2
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_1
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_0
c  in DIMACS:
 5063  5064 -5065  278 -5066 0
 5063  5064 -5065  278 -5067 0
 5063  5064 -5065  278 -5068 0

c  0-1 --> -1
c    (-b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧ -p_278) -> ( b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0)
c  in CNF:
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨  b^{2, 140}_2
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_1
c     b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨  b^{2, 140}_0
c  in DIMACS:
 5063  5064  5065  278  5066 0
 5063  5064  5065  278 -5067 0
 5063  5064  5065  278  5068 0

c  -1-1 --> -2
c    ( b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧  b^{2, 139}_0 ∧ -p_278) -> ( b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0)
c  in CNF:
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨  b^{2, 140}_2
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨  b^{2, 140}_1
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨  p_278 ∨ -b^{2, 140}_0
c  in DIMACS:
-5063  5064 -5065  278  5066 0
-5063  5064 -5065  278  5067 0
-5063  5064 -5065  278 -5068 0

c  -2-1 --> break 
c    ( b^{2, 139}_2 ∧  b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧ -p_278) -> break
c  in CNF:
c    -b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨  b^{2, 139}_0 ∨  p_278 ∨ break
c  in DIMACS:
-5063 -5064  5065  278 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 139}_2 ∧ -b^{2, 139}_1 ∧ -b^{2, 139}_0 ∧ true) 
c  in CNF:
c    -b^{2, 139}_2 ∨  b^{2, 139}_1 ∨  b^{2, 139}_0 ∨ false 
c  in DIMACS:
-5063  5064  5065  0

c  3 does not represent an automaton state.
c    -(-b^{2, 139}_2 ∧  b^{2, 139}_1 ∧  b^{2, 139}_0 ∧ true) 
c  in CNF:
c     b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ false 
c  in DIMACS:
 5063 -5064 -5065  0
c  -3 does not represent an automaton state.
c    -( b^{2, 139}_2 ∧  b^{2, 139}_1 ∧  b^{2, 139}_0 ∧ true) 
c  in CNF:
c    -b^{2, 139}_2 ∨ -b^{2, 139}_1 ∨ -b^{2, 139}_0 ∨ false 
c  in DIMACS:
-5063 -5064 -5065  0

c i = 140
c  -2+1 --> -1
c    ( b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧  p_280) -> ( b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0)
c  in CNF:
c    -b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨  b^{2, 141}_2
c    -b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_1
c    -b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨  b^{2, 141}_0
c  in DIMACS:
-5066 -5067  5068 -280  5069 0
-5066 -5067  5068 -280 -5070 0
-5066 -5067  5068 -280  5071 0

c  -1+1 --> 0
c    ( b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0 ∧  p_280) -> (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧ -b^{2, 141}_0)
c  in CNF:
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_2
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_1
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_0
c  in DIMACS:
-5066  5067 -5068 -280 -5069 0
-5066  5067 -5068 -280 -5070 0
-5066  5067 -5068 -280 -5071 0

c  0+1 --> 1
c    (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧  p_280) -> (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0)
c  in CNF:
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_2
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_1
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨  b^{2, 141}_0
c  in DIMACS:
 5066  5067  5068 -280 -5069 0
 5066  5067  5068 -280 -5070 0
 5066  5067  5068 -280  5071 0

c  1+1 --> 2
c    (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0 ∧  p_280) -> (-b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0)
c  in CNF:
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_2
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨  b^{2, 141}_1
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ -p_280 ∨ -b^{2, 141}_0
c  in DIMACS:
 5066  5067 -5068 -280 -5069 0
 5066  5067 -5068 -280  5070 0
 5066  5067 -5068 -280 -5071 0

c  2+1 --> break 
c    (-b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧  p_280) -> break
c  in CNF:
c     b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 5066 -5067  5068 -280 1162 0


c  2-1 --> 1
c    (-b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧ -p_280) -> (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0)
c  in CNF:
c     b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_2
c     b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_1
c     b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨  b^{2, 141}_0
c  in DIMACS:
 5066 -5067  5068  280 -5069 0
 5066 -5067  5068  280 -5070 0
 5066 -5067  5068  280  5071 0

c  1-1 --> 0
c    (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0 ∧ -p_280) -> (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧ -b^{2, 141}_0)
c  in CNF:
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_2
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_1
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_0
c  in DIMACS:
 5066  5067 -5068  280 -5069 0
 5066  5067 -5068  280 -5070 0
 5066  5067 -5068  280 -5071 0

c  0-1 --> -1
c    (-b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧ -p_280) -> ( b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0)
c  in CNF:
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨  b^{2, 141}_2
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_1
c     b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨  b^{2, 141}_0
c  in DIMACS:
 5066  5067  5068  280  5069 0
 5066  5067  5068  280 -5070 0
 5066  5067  5068  280  5071 0

c  -1-1 --> -2
c    ( b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧  b^{2, 140}_0 ∧ -p_280) -> ( b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0)
c  in CNF:
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨  b^{2, 141}_2
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨  b^{2, 141}_1
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨  p_280 ∨ -b^{2, 141}_0
c  in DIMACS:
-5066  5067 -5068  280  5069 0
-5066  5067 -5068  280  5070 0
-5066  5067 -5068  280 -5071 0

c  -2-1 --> break 
c    ( b^{2, 140}_2 ∧  b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨  b^{2, 140}_0 ∨  p_280 ∨ break
c  in DIMACS:
-5066 -5067  5068  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 140}_2 ∧ -b^{2, 140}_1 ∧ -b^{2, 140}_0 ∧ true) 
c  in CNF:
c    -b^{2, 140}_2 ∨  b^{2, 140}_1 ∨  b^{2, 140}_0 ∨ false 
c  in DIMACS:
-5066  5067  5068  0

c  3 does not represent an automaton state.
c    -(-b^{2, 140}_2 ∧  b^{2, 140}_1 ∧  b^{2, 140}_0 ∧ true) 
c  in CNF:
c     b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ false 
c  in DIMACS:
 5066 -5067 -5068  0
c  -3 does not represent an automaton state.
c    -( b^{2, 140}_2 ∧  b^{2, 140}_1 ∧  b^{2, 140}_0 ∧ true) 
c  in CNF:
c    -b^{2, 140}_2 ∨ -b^{2, 140}_1 ∨ -b^{2, 140}_0 ∨ false 
c  in DIMACS:
-5066 -5067 -5068  0

c i = 141
c  -2+1 --> -1
c    ( b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧  p_282) -> ( b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0)
c  in CNF:
c    -b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨  b^{2, 142}_2
c    -b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_1
c    -b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨  b^{2, 142}_0
c  in DIMACS:
-5069 -5070  5071 -282  5072 0
-5069 -5070  5071 -282 -5073 0
-5069 -5070  5071 -282  5074 0

c  -1+1 --> 0
c    ( b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0 ∧  p_282) -> (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧ -b^{2, 142}_0)
c  in CNF:
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_2
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_1
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_0
c  in DIMACS:
-5069  5070 -5071 -282 -5072 0
-5069  5070 -5071 -282 -5073 0
-5069  5070 -5071 -282 -5074 0

c  0+1 --> 1
c    (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧  p_282) -> (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0)
c  in CNF:
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_2
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_1
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨  b^{2, 142}_0
c  in DIMACS:
 5069  5070  5071 -282 -5072 0
 5069  5070  5071 -282 -5073 0
 5069  5070  5071 -282  5074 0

c  1+1 --> 2
c    (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0 ∧  p_282) -> (-b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0)
c  in CNF:
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_2
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨  b^{2, 142}_1
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ -p_282 ∨ -b^{2, 142}_0
c  in DIMACS:
 5069  5070 -5071 -282 -5072 0
 5069  5070 -5071 -282  5073 0
 5069  5070 -5071 -282 -5074 0

c  2+1 --> break 
c    (-b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧  p_282) -> break
c  in CNF:
c     b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 5069 -5070  5071 -282 1162 0


c  2-1 --> 1
c    (-b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧ -p_282) -> (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0)
c  in CNF:
c     b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_2
c     b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_1
c     b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨  b^{2, 142}_0
c  in DIMACS:
 5069 -5070  5071  282 -5072 0
 5069 -5070  5071  282 -5073 0
 5069 -5070  5071  282  5074 0

c  1-1 --> 0
c    (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0 ∧ -p_282) -> (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧ -b^{2, 142}_0)
c  in CNF:
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_2
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_1
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_0
c  in DIMACS:
 5069  5070 -5071  282 -5072 0
 5069  5070 -5071  282 -5073 0
 5069  5070 -5071  282 -5074 0

c  0-1 --> -1
c    (-b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧ -p_282) -> ( b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0)
c  in CNF:
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨  b^{2, 142}_2
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_1
c     b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨  b^{2, 142}_0
c  in DIMACS:
 5069  5070  5071  282  5072 0
 5069  5070  5071  282 -5073 0
 5069  5070  5071  282  5074 0

c  -1-1 --> -2
c    ( b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧  b^{2, 141}_0 ∧ -p_282) -> ( b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0)
c  in CNF:
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨  b^{2, 142}_2
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨  b^{2, 142}_1
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨  p_282 ∨ -b^{2, 142}_0
c  in DIMACS:
-5069  5070 -5071  282  5072 0
-5069  5070 -5071  282  5073 0
-5069  5070 -5071  282 -5074 0

c  -2-1 --> break 
c    ( b^{2, 141}_2 ∧  b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨  b^{2, 141}_0 ∨  p_282 ∨ break
c  in DIMACS:
-5069 -5070  5071  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 141}_2 ∧ -b^{2, 141}_1 ∧ -b^{2, 141}_0 ∧ true) 
c  in CNF:
c    -b^{2, 141}_2 ∨  b^{2, 141}_1 ∨  b^{2, 141}_0 ∨ false 
c  in DIMACS:
-5069  5070  5071  0

c  3 does not represent an automaton state.
c    -(-b^{2, 141}_2 ∧  b^{2, 141}_1 ∧  b^{2, 141}_0 ∧ true) 
c  in CNF:
c     b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ false 
c  in DIMACS:
 5069 -5070 -5071  0
c  -3 does not represent an automaton state.
c    -( b^{2, 141}_2 ∧  b^{2, 141}_1 ∧  b^{2, 141}_0 ∧ true) 
c  in CNF:
c    -b^{2, 141}_2 ∨ -b^{2, 141}_1 ∨ -b^{2, 141}_0 ∨ false 
c  in DIMACS:
-5069 -5070 -5071  0

c i = 142
c  -2+1 --> -1
c    ( b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧  p_284) -> ( b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0)
c  in CNF:
c    -b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨  b^{2, 143}_2
c    -b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_1
c    -b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨  b^{2, 143}_0
c  in DIMACS:
-5072 -5073  5074 -284  5075 0
-5072 -5073  5074 -284 -5076 0
-5072 -5073  5074 -284  5077 0

c  -1+1 --> 0
c    ( b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0 ∧  p_284) -> (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧ -b^{2, 143}_0)
c  in CNF:
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_2
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_1
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_0
c  in DIMACS:
-5072  5073 -5074 -284 -5075 0
-5072  5073 -5074 -284 -5076 0
-5072  5073 -5074 -284 -5077 0

c  0+1 --> 1
c    (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧  p_284) -> (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0)
c  in CNF:
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_2
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_1
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨  b^{2, 143}_0
c  in DIMACS:
 5072  5073  5074 -284 -5075 0
 5072  5073  5074 -284 -5076 0
 5072  5073  5074 -284  5077 0

c  1+1 --> 2
c    (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0 ∧  p_284) -> (-b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0)
c  in CNF:
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_2
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨  b^{2, 143}_1
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ -p_284 ∨ -b^{2, 143}_0
c  in DIMACS:
 5072  5073 -5074 -284 -5075 0
 5072  5073 -5074 -284  5076 0
 5072  5073 -5074 -284 -5077 0

c  2+1 --> break 
c    (-b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧  p_284) -> break
c  in CNF:
c     b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 5072 -5073  5074 -284 1162 0


c  2-1 --> 1
c    (-b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧ -p_284) -> (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0)
c  in CNF:
c     b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_2
c     b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_1
c     b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨  b^{2, 143}_0
c  in DIMACS:
 5072 -5073  5074  284 -5075 0
 5072 -5073  5074  284 -5076 0
 5072 -5073  5074  284  5077 0

c  1-1 --> 0
c    (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0 ∧ -p_284) -> (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧ -b^{2, 143}_0)
c  in CNF:
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_2
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_1
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_0
c  in DIMACS:
 5072  5073 -5074  284 -5075 0
 5072  5073 -5074  284 -5076 0
 5072  5073 -5074  284 -5077 0

c  0-1 --> -1
c    (-b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧ -p_284) -> ( b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0)
c  in CNF:
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨  b^{2, 143}_2
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_1
c     b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨  b^{2, 143}_0
c  in DIMACS:
 5072  5073  5074  284  5075 0
 5072  5073  5074  284 -5076 0
 5072  5073  5074  284  5077 0

c  -1-1 --> -2
c    ( b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧  b^{2, 142}_0 ∧ -p_284) -> ( b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0)
c  in CNF:
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨  b^{2, 143}_2
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨  b^{2, 143}_1
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨  p_284 ∨ -b^{2, 143}_0
c  in DIMACS:
-5072  5073 -5074  284  5075 0
-5072  5073 -5074  284  5076 0
-5072  5073 -5074  284 -5077 0

c  -2-1 --> break 
c    ( b^{2, 142}_2 ∧  b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨  b^{2, 142}_0 ∨  p_284 ∨ break
c  in DIMACS:
-5072 -5073  5074  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 142}_2 ∧ -b^{2, 142}_1 ∧ -b^{2, 142}_0 ∧ true) 
c  in CNF:
c    -b^{2, 142}_2 ∨  b^{2, 142}_1 ∨  b^{2, 142}_0 ∨ false 
c  in DIMACS:
-5072  5073  5074  0

c  3 does not represent an automaton state.
c    -(-b^{2, 142}_2 ∧  b^{2, 142}_1 ∧  b^{2, 142}_0 ∧ true) 
c  in CNF:
c     b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ false 
c  in DIMACS:
 5072 -5073 -5074  0
c  -3 does not represent an automaton state.
c    -( b^{2, 142}_2 ∧  b^{2, 142}_1 ∧  b^{2, 142}_0 ∧ true) 
c  in CNF:
c    -b^{2, 142}_2 ∨ -b^{2, 142}_1 ∨ -b^{2, 142}_0 ∨ false 
c  in DIMACS:
-5072 -5073 -5074  0

c i = 143
c  -2+1 --> -1
c    ( b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧  p_286) -> ( b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0)
c  in CNF:
c    -b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨  b^{2, 144}_2
c    -b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_1
c    -b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨  b^{2, 144}_0
c  in DIMACS:
-5075 -5076  5077 -286  5078 0
-5075 -5076  5077 -286 -5079 0
-5075 -5076  5077 -286  5080 0

c  -1+1 --> 0
c    ( b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0 ∧  p_286) -> (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧ -b^{2, 144}_0)
c  in CNF:
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_2
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_1
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_0
c  in DIMACS:
-5075  5076 -5077 -286 -5078 0
-5075  5076 -5077 -286 -5079 0
-5075  5076 -5077 -286 -5080 0

c  0+1 --> 1
c    (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧  p_286) -> (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0)
c  in CNF:
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_2
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_1
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨  b^{2, 144}_0
c  in DIMACS:
 5075  5076  5077 -286 -5078 0
 5075  5076  5077 -286 -5079 0
 5075  5076  5077 -286  5080 0

c  1+1 --> 2
c    (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0 ∧  p_286) -> (-b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0)
c  in CNF:
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_2
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨  b^{2, 144}_1
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ -p_286 ∨ -b^{2, 144}_0
c  in DIMACS:
 5075  5076 -5077 -286 -5078 0
 5075  5076 -5077 -286  5079 0
 5075  5076 -5077 -286 -5080 0

c  2+1 --> break 
c    (-b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧  p_286) -> break
c  in CNF:
c     b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 5075 -5076  5077 -286 1162 0


c  2-1 --> 1
c    (-b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧ -p_286) -> (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0)
c  in CNF:
c     b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_2
c     b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_1
c     b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨  b^{2, 144}_0
c  in DIMACS:
 5075 -5076  5077  286 -5078 0
 5075 -5076  5077  286 -5079 0
 5075 -5076  5077  286  5080 0

c  1-1 --> 0
c    (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0 ∧ -p_286) -> (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧ -b^{2, 144}_0)
c  in CNF:
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_2
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_1
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_0
c  in DIMACS:
 5075  5076 -5077  286 -5078 0
 5075  5076 -5077  286 -5079 0
 5075  5076 -5077  286 -5080 0

c  0-1 --> -1
c    (-b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧ -p_286) -> ( b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0)
c  in CNF:
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨  b^{2, 144}_2
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_1
c     b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨  b^{2, 144}_0
c  in DIMACS:
 5075  5076  5077  286  5078 0
 5075  5076  5077  286 -5079 0
 5075  5076  5077  286  5080 0

c  -1-1 --> -2
c    ( b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧  b^{2, 143}_0 ∧ -p_286) -> ( b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0)
c  in CNF:
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨  b^{2, 144}_2
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨  b^{2, 144}_1
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨  p_286 ∨ -b^{2, 144}_0
c  in DIMACS:
-5075  5076 -5077  286  5078 0
-5075  5076 -5077  286  5079 0
-5075  5076 -5077  286 -5080 0

c  -2-1 --> break 
c    ( b^{2, 143}_2 ∧  b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨  b^{2, 143}_0 ∨  p_286 ∨ break
c  in DIMACS:
-5075 -5076  5077  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 143}_2 ∧ -b^{2, 143}_1 ∧ -b^{2, 143}_0 ∧ true) 
c  in CNF:
c    -b^{2, 143}_2 ∨  b^{2, 143}_1 ∨  b^{2, 143}_0 ∨ false 
c  in DIMACS:
-5075  5076  5077  0

c  3 does not represent an automaton state.
c    -(-b^{2, 143}_2 ∧  b^{2, 143}_1 ∧  b^{2, 143}_0 ∧ true) 
c  in CNF:
c     b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ false 
c  in DIMACS:
 5075 -5076 -5077  0
c  -3 does not represent an automaton state.
c    -( b^{2, 143}_2 ∧  b^{2, 143}_1 ∧  b^{2, 143}_0 ∧ true) 
c  in CNF:
c    -b^{2, 143}_2 ∨ -b^{2, 143}_1 ∨ -b^{2, 143}_0 ∨ false 
c  in DIMACS:
-5075 -5076 -5077  0

c i = 144
c  -2+1 --> -1
c    ( b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧  p_288) -> ( b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0)
c  in CNF:
c    -b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨  b^{2, 145}_2
c    -b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_1
c    -b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨  b^{2, 145}_0
c  in DIMACS:
-5078 -5079  5080 -288  5081 0
-5078 -5079  5080 -288 -5082 0
-5078 -5079  5080 -288  5083 0

c  -1+1 --> 0
c    ( b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0 ∧  p_288) -> (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧ -b^{2, 145}_0)
c  in CNF:
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_2
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_1
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_0
c  in DIMACS:
-5078  5079 -5080 -288 -5081 0
-5078  5079 -5080 -288 -5082 0
-5078  5079 -5080 -288 -5083 0

c  0+1 --> 1
c    (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧  p_288) -> (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0)
c  in CNF:
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_2
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_1
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨  b^{2, 145}_0
c  in DIMACS:
 5078  5079  5080 -288 -5081 0
 5078  5079  5080 -288 -5082 0
 5078  5079  5080 -288  5083 0

c  1+1 --> 2
c    (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0 ∧  p_288) -> (-b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0)
c  in CNF:
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_2
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨  b^{2, 145}_1
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ -p_288 ∨ -b^{2, 145}_0
c  in DIMACS:
 5078  5079 -5080 -288 -5081 0
 5078  5079 -5080 -288  5082 0
 5078  5079 -5080 -288 -5083 0

c  2+1 --> break 
c    (-b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧  p_288) -> break
c  in CNF:
c     b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 5078 -5079  5080 -288 1162 0


c  2-1 --> 1
c    (-b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧ -p_288) -> (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0)
c  in CNF:
c     b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_2
c     b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_1
c     b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨  b^{2, 145}_0
c  in DIMACS:
 5078 -5079  5080  288 -5081 0
 5078 -5079  5080  288 -5082 0
 5078 -5079  5080  288  5083 0

c  1-1 --> 0
c    (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0 ∧ -p_288) -> (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧ -b^{2, 145}_0)
c  in CNF:
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_2
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_1
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_0
c  in DIMACS:
 5078  5079 -5080  288 -5081 0
 5078  5079 -5080  288 -5082 0
 5078  5079 -5080  288 -5083 0

c  0-1 --> -1
c    (-b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧ -p_288) -> ( b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0)
c  in CNF:
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨  b^{2, 145}_2
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_1
c     b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨  b^{2, 145}_0
c  in DIMACS:
 5078  5079  5080  288  5081 0
 5078  5079  5080  288 -5082 0
 5078  5079  5080  288  5083 0

c  -1-1 --> -2
c    ( b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧  b^{2, 144}_0 ∧ -p_288) -> ( b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0)
c  in CNF:
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨  b^{2, 145}_2
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨  b^{2, 145}_1
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨  p_288 ∨ -b^{2, 145}_0
c  in DIMACS:
-5078  5079 -5080  288  5081 0
-5078  5079 -5080  288  5082 0
-5078  5079 -5080  288 -5083 0

c  -2-1 --> break 
c    ( b^{2, 144}_2 ∧  b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨  b^{2, 144}_0 ∨  p_288 ∨ break
c  in DIMACS:
-5078 -5079  5080  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 144}_2 ∧ -b^{2, 144}_1 ∧ -b^{2, 144}_0 ∧ true) 
c  in CNF:
c    -b^{2, 144}_2 ∨  b^{2, 144}_1 ∨  b^{2, 144}_0 ∨ false 
c  in DIMACS:
-5078  5079  5080  0

c  3 does not represent an automaton state.
c    -(-b^{2, 144}_2 ∧  b^{2, 144}_1 ∧  b^{2, 144}_0 ∧ true) 
c  in CNF:
c     b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ false 
c  in DIMACS:
 5078 -5079 -5080  0
c  -3 does not represent an automaton state.
c    -( b^{2, 144}_2 ∧  b^{2, 144}_1 ∧  b^{2, 144}_0 ∧ true) 
c  in CNF:
c    -b^{2, 144}_2 ∨ -b^{2, 144}_1 ∨ -b^{2, 144}_0 ∨ false 
c  in DIMACS:
-5078 -5079 -5080  0

c i = 145
c  -2+1 --> -1
c    ( b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧  p_290) -> ( b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0)
c  in CNF:
c    -b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨  b^{2, 146}_2
c    -b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_1
c    -b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨  b^{2, 146}_0
c  in DIMACS:
-5081 -5082  5083 -290  5084 0
-5081 -5082  5083 -290 -5085 0
-5081 -5082  5083 -290  5086 0

c  -1+1 --> 0
c    ( b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0 ∧  p_290) -> (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧ -b^{2, 146}_0)
c  in CNF:
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_2
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_1
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_0
c  in DIMACS:
-5081  5082 -5083 -290 -5084 0
-5081  5082 -5083 -290 -5085 0
-5081  5082 -5083 -290 -5086 0

c  0+1 --> 1
c    (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧  p_290) -> (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0)
c  in CNF:
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_2
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_1
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨  b^{2, 146}_0
c  in DIMACS:
 5081  5082  5083 -290 -5084 0
 5081  5082  5083 -290 -5085 0
 5081  5082  5083 -290  5086 0

c  1+1 --> 2
c    (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0 ∧  p_290) -> (-b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0)
c  in CNF:
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_2
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨  b^{2, 146}_1
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ -p_290 ∨ -b^{2, 146}_0
c  in DIMACS:
 5081  5082 -5083 -290 -5084 0
 5081  5082 -5083 -290  5085 0
 5081  5082 -5083 -290 -5086 0

c  2+1 --> break 
c    (-b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧  p_290) -> break
c  in CNF:
c     b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 5081 -5082  5083 -290 1162 0


c  2-1 --> 1
c    (-b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧ -p_290) -> (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0)
c  in CNF:
c     b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_2
c     b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_1
c     b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨  b^{2, 146}_0
c  in DIMACS:
 5081 -5082  5083  290 -5084 0
 5081 -5082  5083  290 -5085 0
 5081 -5082  5083  290  5086 0

c  1-1 --> 0
c    (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0 ∧ -p_290) -> (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧ -b^{2, 146}_0)
c  in CNF:
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_2
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_1
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_0
c  in DIMACS:
 5081  5082 -5083  290 -5084 0
 5081  5082 -5083  290 -5085 0
 5081  5082 -5083  290 -5086 0

c  0-1 --> -1
c    (-b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧ -p_290) -> ( b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0)
c  in CNF:
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨  b^{2, 146}_2
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_1
c     b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨  b^{2, 146}_0
c  in DIMACS:
 5081  5082  5083  290  5084 0
 5081  5082  5083  290 -5085 0
 5081  5082  5083  290  5086 0

c  -1-1 --> -2
c    ( b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧  b^{2, 145}_0 ∧ -p_290) -> ( b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0)
c  in CNF:
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨  b^{2, 146}_2
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨  b^{2, 146}_1
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨  p_290 ∨ -b^{2, 146}_0
c  in DIMACS:
-5081  5082 -5083  290  5084 0
-5081  5082 -5083  290  5085 0
-5081  5082 -5083  290 -5086 0

c  -2-1 --> break 
c    ( b^{2, 145}_2 ∧  b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨  b^{2, 145}_0 ∨  p_290 ∨ break
c  in DIMACS:
-5081 -5082  5083  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 145}_2 ∧ -b^{2, 145}_1 ∧ -b^{2, 145}_0 ∧ true) 
c  in CNF:
c    -b^{2, 145}_2 ∨  b^{2, 145}_1 ∨  b^{2, 145}_0 ∨ false 
c  in DIMACS:
-5081  5082  5083  0

c  3 does not represent an automaton state.
c    -(-b^{2, 145}_2 ∧  b^{2, 145}_1 ∧  b^{2, 145}_0 ∧ true) 
c  in CNF:
c     b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ false 
c  in DIMACS:
 5081 -5082 -5083  0
c  -3 does not represent an automaton state.
c    -( b^{2, 145}_2 ∧  b^{2, 145}_1 ∧  b^{2, 145}_0 ∧ true) 
c  in CNF:
c    -b^{2, 145}_2 ∨ -b^{2, 145}_1 ∨ -b^{2, 145}_0 ∨ false 
c  in DIMACS:
-5081 -5082 -5083  0

c i = 146
c  -2+1 --> -1
c    ( b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧  p_292) -> ( b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0)
c  in CNF:
c    -b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨  b^{2, 147}_2
c    -b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_1
c    -b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨  b^{2, 147}_0
c  in DIMACS:
-5084 -5085  5086 -292  5087 0
-5084 -5085  5086 -292 -5088 0
-5084 -5085  5086 -292  5089 0

c  -1+1 --> 0
c    ( b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0 ∧  p_292) -> (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧ -b^{2, 147}_0)
c  in CNF:
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_2
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_1
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_0
c  in DIMACS:
-5084  5085 -5086 -292 -5087 0
-5084  5085 -5086 -292 -5088 0
-5084  5085 -5086 -292 -5089 0

c  0+1 --> 1
c    (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧  p_292) -> (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0)
c  in CNF:
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_2
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_1
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨  b^{2, 147}_0
c  in DIMACS:
 5084  5085  5086 -292 -5087 0
 5084  5085  5086 -292 -5088 0
 5084  5085  5086 -292  5089 0

c  1+1 --> 2
c    (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0 ∧  p_292) -> (-b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0)
c  in CNF:
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_2
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨  b^{2, 147}_1
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ -p_292 ∨ -b^{2, 147}_0
c  in DIMACS:
 5084  5085 -5086 -292 -5087 0
 5084  5085 -5086 -292  5088 0
 5084  5085 -5086 -292 -5089 0

c  2+1 --> break 
c    (-b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧  p_292) -> break
c  in CNF:
c     b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 5084 -5085  5086 -292 1162 0


c  2-1 --> 1
c    (-b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧ -p_292) -> (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0)
c  in CNF:
c     b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_2
c     b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_1
c     b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨  b^{2, 147}_0
c  in DIMACS:
 5084 -5085  5086  292 -5087 0
 5084 -5085  5086  292 -5088 0
 5084 -5085  5086  292  5089 0

c  1-1 --> 0
c    (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0 ∧ -p_292) -> (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧ -b^{2, 147}_0)
c  in CNF:
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_2
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_1
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_0
c  in DIMACS:
 5084  5085 -5086  292 -5087 0
 5084  5085 -5086  292 -5088 0
 5084  5085 -5086  292 -5089 0

c  0-1 --> -1
c    (-b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧ -p_292) -> ( b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0)
c  in CNF:
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨  b^{2, 147}_2
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_1
c     b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨  b^{2, 147}_0
c  in DIMACS:
 5084  5085  5086  292  5087 0
 5084  5085  5086  292 -5088 0
 5084  5085  5086  292  5089 0

c  -1-1 --> -2
c    ( b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧  b^{2, 146}_0 ∧ -p_292) -> ( b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0)
c  in CNF:
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨  b^{2, 147}_2
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨  b^{2, 147}_1
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨  p_292 ∨ -b^{2, 147}_0
c  in DIMACS:
-5084  5085 -5086  292  5087 0
-5084  5085 -5086  292  5088 0
-5084  5085 -5086  292 -5089 0

c  -2-1 --> break 
c    ( b^{2, 146}_2 ∧  b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨  b^{2, 146}_0 ∨  p_292 ∨ break
c  in DIMACS:
-5084 -5085  5086  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 146}_2 ∧ -b^{2, 146}_1 ∧ -b^{2, 146}_0 ∧ true) 
c  in CNF:
c    -b^{2, 146}_2 ∨  b^{2, 146}_1 ∨  b^{2, 146}_0 ∨ false 
c  in DIMACS:
-5084  5085  5086  0

c  3 does not represent an automaton state.
c    -(-b^{2, 146}_2 ∧  b^{2, 146}_1 ∧  b^{2, 146}_0 ∧ true) 
c  in CNF:
c     b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ false 
c  in DIMACS:
 5084 -5085 -5086  0
c  -3 does not represent an automaton state.
c    -( b^{2, 146}_2 ∧  b^{2, 146}_1 ∧  b^{2, 146}_0 ∧ true) 
c  in CNF:
c    -b^{2, 146}_2 ∨ -b^{2, 146}_1 ∨ -b^{2, 146}_0 ∨ false 
c  in DIMACS:
-5084 -5085 -5086  0

c i = 147
c  -2+1 --> -1
c    ( b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧  p_294) -> ( b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0)
c  in CNF:
c    -b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨  b^{2, 148}_2
c    -b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_1
c    -b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨  b^{2, 148}_0
c  in DIMACS:
-5087 -5088  5089 -294  5090 0
-5087 -5088  5089 -294 -5091 0
-5087 -5088  5089 -294  5092 0

c  -1+1 --> 0
c    ( b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0 ∧  p_294) -> (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧ -b^{2, 148}_0)
c  in CNF:
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_2
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_1
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_0
c  in DIMACS:
-5087  5088 -5089 -294 -5090 0
-5087  5088 -5089 -294 -5091 0
-5087  5088 -5089 -294 -5092 0

c  0+1 --> 1
c    (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧  p_294) -> (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0)
c  in CNF:
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_2
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_1
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨  b^{2, 148}_0
c  in DIMACS:
 5087  5088  5089 -294 -5090 0
 5087  5088  5089 -294 -5091 0
 5087  5088  5089 -294  5092 0

c  1+1 --> 2
c    (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0 ∧  p_294) -> (-b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0)
c  in CNF:
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_2
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨  b^{2, 148}_1
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ -p_294 ∨ -b^{2, 148}_0
c  in DIMACS:
 5087  5088 -5089 -294 -5090 0
 5087  5088 -5089 -294  5091 0
 5087  5088 -5089 -294 -5092 0

c  2+1 --> break 
c    (-b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧  p_294) -> break
c  in CNF:
c     b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 5087 -5088  5089 -294 1162 0


c  2-1 --> 1
c    (-b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧ -p_294) -> (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0)
c  in CNF:
c     b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_2
c     b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_1
c     b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨  b^{2, 148}_0
c  in DIMACS:
 5087 -5088  5089  294 -5090 0
 5087 -5088  5089  294 -5091 0
 5087 -5088  5089  294  5092 0

c  1-1 --> 0
c    (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0 ∧ -p_294) -> (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧ -b^{2, 148}_0)
c  in CNF:
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_2
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_1
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_0
c  in DIMACS:
 5087  5088 -5089  294 -5090 0
 5087  5088 -5089  294 -5091 0
 5087  5088 -5089  294 -5092 0

c  0-1 --> -1
c    (-b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧ -p_294) -> ( b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0)
c  in CNF:
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨  b^{2, 148}_2
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_1
c     b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨  b^{2, 148}_0
c  in DIMACS:
 5087  5088  5089  294  5090 0
 5087  5088  5089  294 -5091 0
 5087  5088  5089  294  5092 0

c  -1-1 --> -2
c    ( b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧  b^{2, 147}_0 ∧ -p_294) -> ( b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0)
c  in CNF:
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨  b^{2, 148}_2
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨  b^{2, 148}_1
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨  p_294 ∨ -b^{2, 148}_0
c  in DIMACS:
-5087  5088 -5089  294  5090 0
-5087  5088 -5089  294  5091 0
-5087  5088 -5089  294 -5092 0

c  -2-1 --> break 
c    ( b^{2, 147}_2 ∧  b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨  b^{2, 147}_0 ∨  p_294 ∨ break
c  in DIMACS:
-5087 -5088  5089  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 147}_2 ∧ -b^{2, 147}_1 ∧ -b^{2, 147}_0 ∧ true) 
c  in CNF:
c    -b^{2, 147}_2 ∨  b^{2, 147}_1 ∨  b^{2, 147}_0 ∨ false 
c  in DIMACS:
-5087  5088  5089  0

c  3 does not represent an automaton state.
c    -(-b^{2, 147}_2 ∧  b^{2, 147}_1 ∧  b^{2, 147}_0 ∧ true) 
c  in CNF:
c     b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ false 
c  in DIMACS:
 5087 -5088 -5089  0
c  -3 does not represent an automaton state.
c    -( b^{2, 147}_2 ∧  b^{2, 147}_1 ∧  b^{2, 147}_0 ∧ true) 
c  in CNF:
c    -b^{2, 147}_2 ∨ -b^{2, 147}_1 ∨ -b^{2, 147}_0 ∨ false 
c  in DIMACS:
-5087 -5088 -5089  0

c i = 148
c  -2+1 --> -1
c    ( b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧  p_296) -> ( b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0)
c  in CNF:
c    -b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨  b^{2, 149}_2
c    -b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_1
c    -b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨  b^{2, 149}_0
c  in DIMACS:
-5090 -5091  5092 -296  5093 0
-5090 -5091  5092 -296 -5094 0
-5090 -5091  5092 -296  5095 0

c  -1+1 --> 0
c    ( b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0 ∧  p_296) -> (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧ -b^{2, 149}_0)
c  in CNF:
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_2
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_1
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_0
c  in DIMACS:
-5090  5091 -5092 -296 -5093 0
-5090  5091 -5092 -296 -5094 0
-5090  5091 -5092 -296 -5095 0

c  0+1 --> 1
c    (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧  p_296) -> (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0)
c  in CNF:
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_2
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_1
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨  b^{2, 149}_0
c  in DIMACS:
 5090  5091  5092 -296 -5093 0
 5090  5091  5092 -296 -5094 0
 5090  5091  5092 -296  5095 0

c  1+1 --> 2
c    (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0 ∧  p_296) -> (-b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0)
c  in CNF:
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_2
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨  b^{2, 149}_1
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ -p_296 ∨ -b^{2, 149}_0
c  in DIMACS:
 5090  5091 -5092 -296 -5093 0
 5090  5091 -5092 -296  5094 0
 5090  5091 -5092 -296 -5095 0

c  2+1 --> break 
c    (-b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧  p_296) -> break
c  in CNF:
c     b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 5090 -5091  5092 -296 1162 0


c  2-1 --> 1
c    (-b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧ -p_296) -> (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0)
c  in CNF:
c     b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_2
c     b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_1
c     b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨  b^{2, 149}_0
c  in DIMACS:
 5090 -5091  5092  296 -5093 0
 5090 -5091  5092  296 -5094 0
 5090 -5091  5092  296  5095 0

c  1-1 --> 0
c    (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0 ∧ -p_296) -> (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧ -b^{2, 149}_0)
c  in CNF:
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_2
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_1
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_0
c  in DIMACS:
 5090  5091 -5092  296 -5093 0
 5090  5091 -5092  296 -5094 0
 5090  5091 -5092  296 -5095 0

c  0-1 --> -1
c    (-b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧ -p_296) -> ( b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0)
c  in CNF:
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨  b^{2, 149}_2
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_1
c     b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨  b^{2, 149}_0
c  in DIMACS:
 5090  5091  5092  296  5093 0
 5090  5091  5092  296 -5094 0
 5090  5091  5092  296  5095 0

c  -1-1 --> -2
c    ( b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧  b^{2, 148}_0 ∧ -p_296) -> ( b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0)
c  in CNF:
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨  b^{2, 149}_2
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨  b^{2, 149}_1
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨  p_296 ∨ -b^{2, 149}_0
c  in DIMACS:
-5090  5091 -5092  296  5093 0
-5090  5091 -5092  296  5094 0
-5090  5091 -5092  296 -5095 0

c  -2-1 --> break 
c    ( b^{2, 148}_2 ∧  b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨  b^{2, 148}_0 ∨  p_296 ∨ break
c  in DIMACS:
-5090 -5091  5092  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 148}_2 ∧ -b^{2, 148}_1 ∧ -b^{2, 148}_0 ∧ true) 
c  in CNF:
c    -b^{2, 148}_2 ∨  b^{2, 148}_1 ∨  b^{2, 148}_0 ∨ false 
c  in DIMACS:
-5090  5091  5092  0

c  3 does not represent an automaton state.
c    -(-b^{2, 148}_2 ∧  b^{2, 148}_1 ∧  b^{2, 148}_0 ∧ true) 
c  in CNF:
c     b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ false 
c  in DIMACS:
 5090 -5091 -5092  0
c  -3 does not represent an automaton state.
c    -( b^{2, 148}_2 ∧  b^{2, 148}_1 ∧  b^{2, 148}_0 ∧ true) 
c  in CNF:
c    -b^{2, 148}_2 ∨ -b^{2, 148}_1 ∨ -b^{2, 148}_0 ∨ false 
c  in DIMACS:
-5090 -5091 -5092  0

c i = 149
c  -2+1 --> -1
c    ( b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧  p_298) -> ( b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0)
c  in CNF:
c    -b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨  b^{2, 150}_2
c    -b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_1
c    -b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨  b^{2, 150}_0
c  in DIMACS:
-5093 -5094  5095 -298  5096 0
-5093 -5094  5095 -298 -5097 0
-5093 -5094  5095 -298  5098 0

c  -1+1 --> 0
c    ( b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0 ∧  p_298) -> (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧ -b^{2, 150}_0)
c  in CNF:
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_2
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_1
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_0
c  in DIMACS:
-5093  5094 -5095 -298 -5096 0
-5093  5094 -5095 -298 -5097 0
-5093  5094 -5095 -298 -5098 0

c  0+1 --> 1
c    (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧  p_298) -> (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0)
c  in CNF:
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_2
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_1
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨  b^{2, 150}_0
c  in DIMACS:
 5093  5094  5095 -298 -5096 0
 5093  5094  5095 -298 -5097 0
 5093  5094  5095 -298  5098 0

c  1+1 --> 2
c    (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0 ∧  p_298) -> (-b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0)
c  in CNF:
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_2
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨  b^{2, 150}_1
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ -p_298 ∨ -b^{2, 150}_0
c  in DIMACS:
 5093  5094 -5095 -298 -5096 0
 5093  5094 -5095 -298  5097 0
 5093  5094 -5095 -298 -5098 0

c  2+1 --> break 
c    (-b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧  p_298) -> break
c  in CNF:
c     b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ -p_298 ∨ break
c  in DIMACS:
 5093 -5094  5095 -298 1162 0


c  2-1 --> 1
c    (-b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧ -p_298) -> (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0)
c  in CNF:
c     b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_2
c     b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_1
c     b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨  b^{2, 150}_0
c  in DIMACS:
 5093 -5094  5095  298 -5096 0
 5093 -5094  5095  298 -5097 0
 5093 -5094  5095  298  5098 0

c  1-1 --> 0
c    (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0 ∧ -p_298) -> (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧ -b^{2, 150}_0)
c  in CNF:
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_2
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_1
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_0
c  in DIMACS:
 5093  5094 -5095  298 -5096 0
 5093  5094 -5095  298 -5097 0
 5093  5094 -5095  298 -5098 0

c  0-1 --> -1
c    (-b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧ -p_298) -> ( b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0)
c  in CNF:
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨  b^{2, 150}_2
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_1
c     b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨  b^{2, 150}_0
c  in DIMACS:
 5093  5094  5095  298  5096 0
 5093  5094  5095  298 -5097 0
 5093  5094  5095  298  5098 0

c  -1-1 --> -2
c    ( b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧  b^{2, 149}_0 ∧ -p_298) -> ( b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0)
c  in CNF:
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨  b^{2, 150}_2
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨  b^{2, 150}_1
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨  p_298 ∨ -b^{2, 150}_0
c  in DIMACS:
-5093  5094 -5095  298  5096 0
-5093  5094 -5095  298  5097 0
-5093  5094 -5095  298 -5098 0

c  -2-1 --> break 
c    ( b^{2, 149}_2 ∧  b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧ -p_298) -> break
c  in CNF:
c    -b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨  b^{2, 149}_0 ∨  p_298 ∨ break
c  in DIMACS:
-5093 -5094  5095  298 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 149}_2 ∧ -b^{2, 149}_1 ∧ -b^{2, 149}_0 ∧ true) 
c  in CNF:
c    -b^{2, 149}_2 ∨  b^{2, 149}_1 ∨  b^{2, 149}_0 ∨ false 
c  in DIMACS:
-5093  5094  5095  0

c  3 does not represent an automaton state.
c    -(-b^{2, 149}_2 ∧  b^{2, 149}_1 ∧  b^{2, 149}_0 ∧ true) 
c  in CNF:
c     b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ false 
c  in DIMACS:
 5093 -5094 -5095  0
c  -3 does not represent an automaton state.
c    -( b^{2, 149}_2 ∧  b^{2, 149}_1 ∧  b^{2, 149}_0 ∧ true) 
c  in CNF:
c    -b^{2, 149}_2 ∨ -b^{2, 149}_1 ∨ -b^{2, 149}_0 ∨ false 
c  in DIMACS:
-5093 -5094 -5095  0

c i = 150
c  -2+1 --> -1
c    ( b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧  p_300) -> ( b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0)
c  in CNF:
c    -b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨  b^{2, 151}_2
c    -b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_1
c    -b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨  b^{2, 151}_0
c  in DIMACS:
-5096 -5097  5098 -300  5099 0
-5096 -5097  5098 -300 -5100 0
-5096 -5097  5098 -300  5101 0

c  -1+1 --> 0
c    ( b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0 ∧  p_300) -> (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧ -b^{2, 151}_0)
c  in CNF:
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_2
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_1
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_0
c  in DIMACS:
-5096  5097 -5098 -300 -5099 0
-5096  5097 -5098 -300 -5100 0
-5096  5097 -5098 -300 -5101 0

c  0+1 --> 1
c    (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧  p_300) -> (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0)
c  in CNF:
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_2
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_1
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨  b^{2, 151}_0
c  in DIMACS:
 5096  5097  5098 -300 -5099 0
 5096  5097  5098 -300 -5100 0
 5096  5097  5098 -300  5101 0

c  1+1 --> 2
c    (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0 ∧  p_300) -> (-b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0)
c  in CNF:
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_2
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨  b^{2, 151}_1
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ -p_300 ∨ -b^{2, 151}_0
c  in DIMACS:
 5096  5097 -5098 -300 -5099 0
 5096  5097 -5098 -300  5100 0
 5096  5097 -5098 -300 -5101 0

c  2+1 --> break 
c    (-b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧  p_300) -> break
c  in CNF:
c     b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 5096 -5097  5098 -300 1162 0


c  2-1 --> 1
c    (-b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧ -p_300) -> (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0)
c  in CNF:
c     b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_2
c     b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_1
c     b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨  b^{2, 151}_0
c  in DIMACS:
 5096 -5097  5098  300 -5099 0
 5096 -5097  5098  300 -5100 0
 5096 -5097  5098  300  5101 0

c  1-1 --> 0
c    (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0 ∧ -p_300) -> (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧ -b^{2, 151}_0)
c  in CNF:
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_2
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_1
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_0
c  in DIMACS:
 5096  5097 -5098  300 -5099 0
 5096  5097 -5098  300 -5100 0
 5096  5097 -5098  300 -5101 0

c  0-1 --> -1
c    (-b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧ -p_300) -> ( b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0)
c  in CNF:
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨  b^{2, 151}_2
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_1
c     b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨  b^{2, 151}_0
c  in DIMACS:
 5096  5097  5098  300  5099 0
 5096  5097  5098  300 -5100 0
 5096  5097  5098  300  5101 0

c  -1-1 --> -2
c    ( b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧  b^{2, 150}_0 ∧ -p_300) -> ( b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0)
c  in CNF:
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨  b^{2, 151}_2
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨  b^{2, 151}_1
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨  p_300 ∨ -b^{2, 151}_0
c  in DIMACS:
-5096  5097 -5098  300  5099 0
-5096  5097 -5098  300  5100 0
-5096  5097 -5098  300 -5101 0

c  -2-1 --> break 
c    ( b^{2, 150}_2 ∧  b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨  b^{2, 150}_0 ∨  p_300 ∨ break
c  in DIMACS:
-5096 -5097  5098  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 150}_2 ∧ -b^{2, 150}_1 ∧ -b^{2, 150}_0 ∧ true) 
c  in CNF:
c    -b^{2, 150}_2 ∨  b^{2, 150}_1 ∨  b^{2, 150}_0 ∨ false 
c  in DIMACS:
-5096  5097  5098  0

c  3 does not represent an automaton state.
c    -(-b^{2, 150}_2 ∧  b^{2, 150}_1 ∧  b^{2, 150}_0 ∧ true) 
c  in CNF:
c     b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ false 
c  in DIMACS:
 5096 -5097 -5098  0
c  -3 does not represent an automaton state.
c    -( b^{2, 150}_2 ∧  b^{2, 150}_1 ∧  b^{2, 150}_0 ∧ true) 
c  in CNF:
c    -b^{2, 150}_2 ∨ -b^{2, 150}_1 ∨ -b^{2, 150}_0 ∨ false 
c  in DIMACS:
-5096 -5097 -5098  0

c i = 151
c  -2+1 --> -1
c    ( b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧  p_302) -> ( b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0)
c  in CNF:
c    -b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨  b^{2, 152}_2
c    -b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_1
c    -b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨  b^{2, 152}_0
c  in DIMACS:
-5099 -5100  5101 -302  5102 0
-5099 -5100  5101 -302 -5103 0
-5099 -5100  5101 -302  5104 0

c  -1+1 --> 0
c    ( b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0 ∧  p_302) -> (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧ -b^{2, 152}_0)
c  in CNF:
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_2
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_1
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_0
c  in DIMACS:
-5099  5100 -5101 -302 -5102 0
-5099  5100 -5101 -302 -5103 0
-5099  5100 -5101 -302 -5104 0

c  0+1 --> 1
c    (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧  p_302) -> (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0)
c  in CNF:
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_2
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_1
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨  b^{2, 152}_0
c  in DIMACS:
 5099  5100  5101 -302 -5102 0
 5099  5100  5101 -302 -5103 0
 5099  5100  5101 -302  5104 0

c  1+1 --> 2
c    (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0 ∧  p_302) -> (-b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0)
c  in CNF:
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_2
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨  b^{2, 152}_1
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ -p_302 ∨ -b^{2, 152}_0
c  in DIMACS:
 5099  5100 -5101 -302 -5102 0
 5099  5100 -5101 -302  5103 0
 5099  5100 -5101 -302 -5104 0

c  2+1 --> break 
c    (-b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧  p_302) -> break
c  in CNF:
c     b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ -p_302 ∨ break
c  in DIMACS:
 5099 -5100  5101 -302 1162 0


c  2-1 --> 1
c    (-b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧ -p_302) -> (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0)
c  in CNF:
c     b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_2
c     b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_1
c     b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨  b^{2, 152}_0
c  in DIMACS:
 5099 -5100  5101  302 -5102 0
 5099 -5100  5101  302 -5103 0
 5099 -5100  5101  302  5104 0

c  1-1 --> 0
c    (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0 ∧ -p_302) -> (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧ -b^{2, 152}_0)
c  in CNF:
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_2
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_1
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_0
c  in DIMACS:
 5099  5100 -5101  302 -5102 0
 5099  5100 -5101  302 -5103 0
 5099  5100 -5101  302 -5104 0

c  0-1 --> -1
c    (-b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧ -p_302) -> ( b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0)
c  in CNF:
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨  b^{2, 152}_2
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_1
c     b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨  b^{2, 152}_0
c  in DIMACS:
 5099  5100  5101  302  5102 0
 5099  5100  5101  302 -5103 0
 5099  5100  5101  302  5104 0

c  -1-1 --> -2
c    ( b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧  b^{2, 151}_0 ∧ -p_302) -> ( b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0)
c  in CNF:
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨  b^{2, 152}_2
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨  b^{2, 152}_1
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨  p_302 ∨ -b^{2, 152}_0
c  in DIMACS:
-5099  5100 -5101  302  5102 0
-5099  5100 -5101  302  5103 0
-5099  5100 -5101  302 -5104 0

c  -2-1 --> break 
c    ( b^{2, 151}_2 ∧  b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧ -p_302) -> break
c  in CNF:
c    -b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨  b^{2, 151}_0 ∨  p_302 ∨ break
c  in DIMACS:
-5099 -5100  5101  302 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 151}_2 ∧ -b^{2, 151}_1 ∧ -b^{2, 151}_0 ∧ true) 
c  in CNF:
c    -b^{2, 151}_2 ∨  b^{2, 151}_1 ∨  b^{2, 151}_0 ∨ false 
c  in DIMACS:
-5099  5100  5101  0

c  3 does not represent an automaton state.
c    -(-b^{2, 151}_2 ∧  b^{2, 151}_1 ∧  b^{2, 151}_0 ∧ true) 
c  in CNF:
c     b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ false 
c  in DIMACS:
 5099 -5100 -5101  0
c  -3 does not represent an automaton state.
c    -( b^{2, 151}_2 ∧  b^{2, 151}_1 ∧  b^{2, 151}_0 ∧ true) 
c  in CNF:
c    -b^{2, 151}_2 ∨ -b^{2, 151}_1 ∨ -b^{2, 151}_0 ∨ false 
c  in DIMACS:
-5099 -5100 -5101  0

c i = 152
c  -2+1 --> -1
c    ( b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧  p_304) -> ( b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0)
c  in CNF:
c    -b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨  b^{2, 153}_2
c    -b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_1
c    -b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨  b^{2, 153}_0
c  in DIMACS:
-5102 -5103  5104 -304  5105 0
-5102 -5103  5104 -304 -5106 0
-5102 -5103  5104 -304  5107 0

c  -1+1 --> 0
c    ( b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0 ∧  p_304) -> (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧ -b^{2, 153}_0)
c  in CNF:
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_2
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_1
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_0
c  in DIMACS:
-5102  5103 -5104 -304 -5105 0
-5102  5103 -5104 -304 -5106 0
-5102  5103 -5104 -304 -5107 0

c  0+1 --> 1
c    (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧  p_304) -> (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0)
c  in CNF:
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_2
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_1
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨  b^{2, 153}_0
c  in DIMACS:
 5102  5103  5104 -304 -5105 0
 5102  5103  5104 -304 -5106 0
 5102  5103  5104 -304  5107 0

c  1+1 --> 2
c    (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0 ∧  p_304) -> (-b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0)
c  in CNF:
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_2
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨  b^{2, 153}_1
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ -p_304 ∨ -b^{2, 153}_0
c  in DIMACS:
 5102  5103 -5104 -304 -5105 0
 5102  5103 -5104 -304  5106 0
 5102  5103 -5104 -304 -5107 0

c  2+1 --> break 
c    (-b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧  p_304) -> break
c  in CNF:
c     b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 5102 -5103  5104 -304 1162 0


c  2-1 --> 1
c    (-b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧ -p_304) -> (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0)
c  in CNF:
c     b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_2
c     b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_1
c     b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨  b^{2, 153}_0
c  in DIMACS:
 5102 -5103  5104  304 -5105 0
 5102 -5103  5104  304 -5106 0
 5102 -5103  5104  304  5107 0

c  1-1 --> 0
c    (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0 ∧ -p_304) -> (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧ -b^{2, 153}_0)
c  in CNF:
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_2
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_1
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_0
c  in DIMACS:
 5102  5103 -5104  304 -5105 0
 5102  5103 -5104  304 -5106 0
 5102  5103 -5104  304 -5107 0

c  0-1 --> -1
c    (-b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧ -p_304) -> ( b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0)
c  in CNF:
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨  b^{2, 153}_2
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_1
c     b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨  b^{2, 153}_0
c  in DIMACS:
 5102  5103  5104  304  5105 0
 5102  5103  5104  304 -5106 0
 5102  5103  5104  304  5107 0

c  -1-1 --> -2
c    ( b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧  b^{2, 152}_0 ∧ -p_304) -> ( b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0)
c  in CNF:
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨  b^{2, 153}_2
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨  b^{2, 153}_1
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨  p_304 ∨ -b^{2, 153}_0
c  in DIMACS:
-5102  5103 -5104  304  5105 0
-5102  5103 -5104  304  5106 0
-5102  5103 -5104  304 -5107 0

c  -2-1 --> break 
c    ( b^{2, 152}_2 ∧  b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨  b^{2, 152}_0 ∨  p_304 ∨ break
c  in DIMACS:
-5102 -5103  5104  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 152}_2 ∧ -b^{2, 152}_1 ∧ -b^{2, 152}_0 ∧ true) 
c  in CNF:
c    -b^{2, 152}_2 ∨  b^{2, 152}_1 ∨  b^{2, 152}_0 ∨ false 
c  in DIMACS:
-5102  5103  5104  0

c  3 does not represent an automaton state.
c    -(-b^{2, 152}_2 ∧  b^{2, 152}_1 ∧  b^{2, 152}_0 ∧ true) 
c  in CNF:
c     b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ false 
c  in DIMACS:
 5102 -5103 -5104  0
c  -3 does not represent an automaton state.
c    -( b^{2, 152}_2 ∧  b^{2, 152}_1 ∧  b^{2, 152}_0 ∧ true) 
c  in CNF:
c    -b^{2, 152}_2 ∨ -b^{2, 152}_1 ∨ -b^{2, 152}_0 ∨ false 
c  in DIMACS:
-5102 -5103 -5104  0

c i = 153
c  -2+1 --> -1
c    ( b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧  p_306) -> ( b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0)
c  in CNF:
c    -b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨  b^{2, 154}_2
c    -b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_1
c    -b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨  b^{2, 154}_0
c  in DIMACS:
-5105 -5106  5107 -306  5108 0
-5105 -5106  5107 -306 -5109 0
-5105 -5106  5107 -306  5110 0

c  -1+1 --> 0
c    ( b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0 ∧  p_306) -> (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧ -b^{2, 154}_0)
c  in CNF:
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_2
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_1
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_0
c  in DIMACS:
-5105  5106 -5107 -306 -5108 0
-5105  5106 -5107 -306 -5109 0
-5105  5106 -5107 -306 -5110 0

c  0+1 --> 1
c    (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧  p_306) -> (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0)
c  in CNF:
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_2
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_1
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨  b^{2, 154}_0
c  in DIMACS:
 5105  5106  5107 -306 -5108 0
 5105  5106  5107 -306 -5109 0
 5105  5106  5107 -306  5110 0

c  1+1 --> 2
c    (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0 ∧  p_306) -> (-b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0)
c  in CNF:
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_2
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨  b^{2, 154}_1
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ -p_306 ∨ -b^{2, 154}_0
c  in DIMACS:
 5105  5106 -5107 -306 -5108 0
 5105  5106 -5107 -306  5109 0
 5105  5106 -5107 -306 -5110 0

c  2+1 --> break 
c    (-b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧  p_306) -> break
c  in CNF:
c     b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 5105 -5106  5107 -306 1162 0


c  2-1 --> 1
c    (-b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧ -p_306) -> (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0)
c  in CNF:
c     b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_2
c     b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_1
c     b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨  b^{2, 154}_0
c  in DIMACS:
 5105 -5106  5107  306 -5108 0
 5105 -5106  5107  306 -5109 0
 5105 -5106  5107  306  5110 0

c  1-1 --> 0
c    (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0 ∧ -p_306) -> (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧ -b^{2, 154}_0)
c  in CNF:
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_2
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_1
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_0
c  in DIMACS:
 5105  5106 -5107  306 -5108 0
 5105  5106 -5107  306 -5109 0
 5105  5106 -5107  306 -5110 0

c  0-1 --> -1
c    (-b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧ -p_306) -> ( b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0)
c  in CNF:
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨  b^{2, 154}_2
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_1
c     b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨  b^{2, 154}_0
c  in DIMACS:
 5105  5106  5107  306  5108 0
 5105  5106  5107  306 -5109 0
 5105  5106  5107  306  5110 0

c  -1-1 --> -2
c    ( b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧  b^{2, 153}_0 ∧ -p_306) -> ( b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0)
c  in CNF:
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨  b^{2, 154}_2
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨  b^{2, 154}_1
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨  p_306 ∨ -b^{2, 154}_0
c  in DIMACS:
-5105  5106 -5107  306  5108 0
-5105  5106 -5107  306  5109 0
-5105  5106 -5107  306 -5110 0

c  -2-1 --> break 
c    ( b^{2, 153}_2 ∧  b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨  b^{2, 153}_0 ∨  p_306 ∨ break
c  in DIMACS:
-5105 -5106  5107  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 153}_2 ∧ -b^{2, 153}_1 ∧ -b^{2, 153}_0 ∧ true) 
c  in CNF:
c    -b^{2, 153}_2 ∨  b^{2, 153}_1 ∨  b^{2, 153}_0 ∨ false 
c  in DIMACS:
-5105  5106  5107  0

c  3 does not represent an automaton state.
c    -(-b^{2, 153}_2 ∧  b^{2, 153}_1 ∧  b^{2, 153}_0 ∧ true) 
c  in CNF:
c     b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ false 
c  in DIMACS:
 5105 -5106 -5107  0
c  -3 does not represent an automaton state.
c    -( b^{2, 153}_2 ∧  b^{2, 153}_1 ∧  b^{2, 153}_0 ∧ true) 
c  in CNF:
c    -b^{2, 153}_2 ∨ -b^{2, 153}_1 ∨ -b^{2, 153}_0 ∨ false 
c  in DIMACS:
-5105 -5106 -5107  0

c i = 154
c  -2+1 --> -1
c    ( b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧  p_308) -> ( b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0)
c  in CNF:
c    -b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨  b^{2, 155}_2
c    -b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_1
c    -b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨  b^{2, 155}_0
c  in DIMACS:
-5108 -5109  5110 -308  5111 0
-5108 -5109  5110 -308 -5112 0
-5108 -5109  5110 -308  5113 0

c  -1+1 --> 0
c    ( b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0 ∧  p_308) -> (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧ -b^{2, 155}_0)
c  in CNF:
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_2
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_1
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_0
c  in DIMACS:
-5108  5109 -5110 -308 -5111 0
-5108  5109 -5110 -308 -5112 0
-5108  5109 -5110 -308 -5113 0

c  0+1 --> 1
c    (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧  p_308) -> (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0)
c  in CNF:
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_2
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_1
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨  b^{2, 155}_0
c  in DIMACS:
 5108  5109  5110 -308 -5111 0
 5108  5109  5110 -308 -5112 0
 5108  5109  5110 -308  5113 0

c  1+1 --> 2
c    (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0 ∧  p_308) -> (-b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0)
c  in CNF:
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_2
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨  b^{2, 155}_1
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ -p_308 ∨ -b^{2, 155}_0
c  in DIMACS:
 5108  5109 -5110 -308 -5111 0
 5108  5109 -5110 -308  5112 0
 5108  5109 -5110 -308 -5113 0

c  2+1 --> break 
c    (-b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧  p_308) -> break
c  in CNF:
c     b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 5108 -5109  5110 -308 1162 0


c  2-1 --> 1
c    (-b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧ -p_308) -> (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0)
c  in CNF:
c     b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_2
c     b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_1
c     b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨  b^{2, 155}_0
c  in DIMACS:
 5108 -5109  5110  308 -5111 0
 5108 -5109  5110  308 -5112 0
 5108 -5109  5110  308  5113 0

c  1-1 --> 0
c    (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0 ∧ -p_308) -> (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧ -b^{2, 155}_0)
c  in CNF:
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_2
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_1
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_0
c  in DIMACS:
 5108  5109 -5110  308 -5111 0
 5108  5109 -5110  308 -5112 0
 5108  5109 -5110  308 -5113 0

c  0-1 --> -1
c    (-b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧ -p_308) -> ( b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0)
c  in CNF:
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨  b^{2, 155}_2
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_1
c     b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨  b^{2, 155}_0
c  in DIMACS:
 5108  5109  5110  308  5111 0
 5108  5109  5110  308 -5112 0
 5108  5109  5110  308  5113 0

c  -1-1 --> -2
c    ( b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧  b^{2, 154}_0 ∧ -p_308) -> ( b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0)
c  in CNF:
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨  b^{2, 155}_2
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨  b^{2, 155}_1
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨  p_308 ∨ -b^{2, 155}_0
c  in DIMACS:
-5108  5109 -5110  308  5111 0
-5108  5109 -5110  308  5112 0
-5108  5109 -5110  308 -5113 0

c  -2-1 --> break 
c    ( b^{2, 154}_2 ∧  b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨  b^{2, 154}_0 ∨  p_308 ∨ break
c  in DIMACS:
-5108 -5109  5110  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 154}_2 ∧ -b^{2, 154}_1 ∧ -b^{2, 154}_0 ∧ true) 
c  in CNF:
c    -b^{2, 154}_2 ∨  b^{2, 154}_1 ∨  b^{2, 154}_0 ∨ false 
c  in DIMACS:
-5108  5109  5110  0

c  3 does not represent an automaton state.
c    -(-b^{2, 154}_2 ∧  b^{2, 154}_1 ∧  b^{2, 154}_0 ∧ true) 
c  in CNF:
c     b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ false 
c  in DIMACS:
 5108 -5109 -5110  0
c  -3 does not represent an automaton state.
c    -( b^{2, 154}_2 ∧  b^{2, 154}_1 ∧  b^{2, 154}_0 ∧ true) 
c  in CNF:
c    -b^{2, 154}_2 ∨ -b^{2, 154}_1 ∨ -b^{2, 154}_0 ∨ false 
c  in DIMACS:
-5108 -5109 -5110  0

c i = 155
c  -2+1 --> -1
c    ( b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧  p_310) -> ( b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0)
c  in CNF:
c    -b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨  b^{2, 156}_2
c    -b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_1
c    -b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨  b^{2, 156}_0
c  in DIMACS:
-5111 -5112  5113 -310  5114 0
-5111 -5112  5113 -310 -5115 0
-5111 -5112  5113 -310  5116 0

c  -1+1 --> 0
c    ( b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0 ∧  p_310) -> (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧ -b^{2, 156}_0)
c  in CNF:
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_2
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_1
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_0
c  in DIMACS:
-5111  5112 -5113 -310 -5114 0
-5111  5112 -5113 -310 -5115 0
-5111  5112 -5113 -310 -5116 0

c  0+1 --> 1
c    (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧  p_310) -> (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0)
c  in CNF:
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_2
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_1
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨  b^{2, 156}_0
c  in DIMACS:
 5111  5112  5113 -310 -5114 0
 5111  5112  5113 -310 -5115 0
 5111  5112  5113 -310  5116 0

c  1+1 --> 2
c    (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0 ∧  p_310) -> (-b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0)
c  in CNF:
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_2
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨  b^{2, 156}_1
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ -p_310 ∨ -b^{2, 156}_0
c  in DIMACS:
 5111  5112 -5113 -310 -5114 0
 5111  5112 -5113 -310  5115 0
 5111  5112 -5113 -310 -5116 0

c  2+1 --> break 
c    (-b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧  p_310) -> break
c  in CNF:
c     b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 5111 -5112  5113 -310 1162 0


c  2-1 --> 1
c    (-b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧ -p_310) -> (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0)
c  in CNF:
c     b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_2
c     b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_1
c     b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨  b^{2, 156}_0
c  in DIMACS:
 5111 -5112  5113  310 -5114 0
 5111 -5112  5113  310 -5115 0
 5111 -5112  5113  310  5116 0

c  1-1 --> 0
c    (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0 ∧ -p_310) -> (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧ -b^{2, 156}_0)
c  in CNF:
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_2
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_1
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_0
c  in DIMACS:
 5111  5112 -5113  310 -5114 0
 5111  5112 -5113  310 -5115 0
 5111  5112 -5113  310 -5116 0

c  0-1 --> -1
c    (-b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧ -p_310) -> ( b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0)
c  in CNF:
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨  b^{2, 156}_2
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_1
c     b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨  b^{2, 156}_0
c  in DIMACS:
 5111  5112  5113  310  5114 0
 5111  5112  5113  310 -5115 0
 5111  5112  5113  310  5116 0

c  -1-1 --> -2
c    ( b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧  b^{2, 155}_0 ∧ -p_310) -> ( b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0)
c  in CNF:
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨  b^{2, 156}_2
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨  b^{2, 156}_1
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨  p_310 ∨ -b^{2, 156}_0
c  in DIMACS:
-5111  5112 -5113  310  5114 0
-5111  5112 -5113  310  5115 0
-5111  5112 -5113  310 -5116 0

c  -2-1 --> break 
c    ( b^{2, 155}_2 ∧  b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨  b^{2, 155}_0 ∨  p_310 ∨ break
c  in DIMACS:
-5111 -5112  5113  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 155}_2 ∧ -b^{2, 155}_1 ∧ -b^{2, 155}_0 ∧ true) 
c  in CNF:
c    -b^{2, 155}_2 ∨  b^{2, 155}_1 ∨  b^{2, 155}_0 ∨ false 
c  in DIMACS:
-5111  5112  5113  0

c  3 does not represent an automaton state.
c    -(-b^{2, 155}_2 ∧  b^{2, 155}_1 ∧  b^{2, 155}_0 ∧ true) 
c  in CNF:
c     b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ false 
c  in DIMACS:
 5111 -5112 -5113  0
c  -3 does not represent an automaton state.
c    -( b^{2, 155}_2 ∧  b^{2, 155}_1 ∧  b^{2, 155}_0 ∧ true) 
c  in CNF:
c    -b^{2, 155}_2 ∨ -b^{2, 155}_1 ∨ -b^{2, 155}_0 ∨ false 
c  in DIMACS:
-5111 -5112 -5113  0

c i = 156
c  -2+1 --> -1
c    ( b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧  p_312) -> ( b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0)
c  in CNF:
c    -b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨  b^{2, 157}_2
c    -b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_1
c    -b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨  b^{2, 157}_0
c  in DIMACS:
-5114 -5115  5116 -312  5117 0
-5114 -5115  5116 -312 -5118 0
-5114 -5115  5116 -312  5119 0

c  -1+1 --> 0
c    ( b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0 ∧  p_312) -> (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧ -b^{2, 157}_0)
c  in CNF:
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_2
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_1
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_0
c  in DIMACS:
-5114  5115 -5116 -312 -5117 0
-5114  5115 -5116 -312 -5118 0
-5114  5115 -5116 -312 -5119 0

c  0+1 --> 1
c    (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧  p_312) -> (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0)
c  in CNF:
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_2
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_1
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨  b^{2, 157}_0
c  in DIMACS:
 5114  5115  5116 -312 -5117 0
 5114  5115  5116 -312 -5118 0
 5114  5115  5116 -312  5119 0

c  1+1 --> 2
c    (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0 ∧  p_312) -> (-b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0)
c  in CNF:
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_2
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨  b^{2, 157}_1
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ -p_312 ∨ -b^{2, 157}_0
c  in DIMACS:
 5114  5115 -5116 -312 -5117 0
 5114  5115 -5116 -312  5118 0
 5114  5115 -5116 -312 -5119 0

c  2+1 --> break 
c    (-b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧  p_312) -> break
c  in CNF:
c     b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 5114 -5115  5116 -312 1162 0


c  2-1 --> 1
c    (-b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧ -p_312) -> (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0)
c  in CNF:
c     b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_2
c     b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_1
c     b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨  b^{2, 157}_0
c  in DIMACS:
 5114 -5115  5116  312 -5117 0
 5114 -5115  5116  312 -5118 0
 5114 -5115  5116  312  5119 0

c  1-1 --> 0
c    (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0 ∧ -p_312) -> (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧ -b^{2, 157}_0)
c  in CNF:
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_2
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_1
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_0
c  in DIMACS:
 5114  5115 -5116  312 -5117 0
 5114  5115 -5116  312 -5118 0
 5114  5115 -5116  312 -5119 0

c  0-1 --> -1
c    (-b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧ -p_312) -> ( b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0)
c  in CNF:
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨  b^{2, 157}_2
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_1
c     b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨  b^{2, 157}_0
c  in DIMACS:
 5114  5115  5116  312  5117 0
 5114  5115  5116  312 -5118 0
 5114  5115  5116  312  5119 0

c  -1-1 --> -2
c    ( b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧  b^{2, 156}_0 ∧ -p_312) -> ( b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0)
c  in CNF:
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨  b^{2, 157}_2
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨  b^{2, 157}_1
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨  p_312 ∨ -b^{2, 157}_0
c  in DIMACS:
-5114  5115 -5116  312  5117 0
-5114  5115 -5116  312  5118 0
-5114  5115 -5116  312 -5119 0

c  -2-1 --> break 
c    ( b^{2, 156}_2 ∧  b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨  b^{2, 156}_0 ∨  p_312 ∨ break
c  in DIMACS:
-5114 -5115  5116  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 156}_2 ∧ -b^{2, 156}_1 ∧ -b^{2, 156}_0 ∧ true) 
c  in CNF:
c    -b^{2, 156}_2 ∨  b^{2, 156}_1 ∨  b^{2, 156}_0 ∨ false 
c  in DIMACS:
-5114  5115  5116  0

c  3 does not represent an automaton state.
c    -(-b^{2, 156}_2 ∧  b^{2, 156}_1 ∧  b^{2, 156}_0 ∧ true) 
c  in CNF:
c     b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ false 
c  in DIMACS:
 5114 -5115 -5116  0
c  -3 does not represent an automaton state.
c    -( b^{2, 156}_2 ∧  b^{2, 156}_1 ∧  b^{2, 156}_0 ∧ true) 
c  in CNF:
c    -b^{2, 156}_2 ∨ -b^{2, 156}_1 ∨ -b^{2, 156}_0 ∨ false 
c  in DIMACS:
-5114 -5115 -5116  0

c i = 157
c  -2+1 --> -1
c    ( b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧  p_314) -> ( b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0)
c  in CNF:
c    -b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨  b^{2, 158}_2
c    -b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_1
c    -b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨  b^{2, 158}_0
c  in DIMACS:
-5117 -5118  5119 -314  5120 0
-5117 -5118  5119 -314 -5121 0
-5117 -5118  5119 -314  5122 0

c  -1+1 --> 0
c    ( b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0 ∧  p_314) -> (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧ -b^{2, 158}_0)
c  in CNF:
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_2
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_1
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_0
c  in DIMACS:
-5117  5118 -5119 -314 -5120 0
-5117  5118 -5119 -314 -5121 0
-5117  5118 -5119 -314 -5122 0

c  0+1 --> 1
c    (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧  p_314) -> (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0)
c  in CNF:
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_2
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_1
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨  b^{2, 158}_0
c  in DIMACS:
 5117  5118  5119 -314 -5120 0
 5117  5118  5119 -314 -5121 0
 5117  5118  5119 -314  5122 0

c  1+1 --> 2
c    (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0 ∧  p_314) -> (-b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0)
c  in CNF:
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_2
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨  b^{2, 158}_1
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ -p_314 ∨ -b^{2, 158}_0
c  in DIMACS:
 5117  5118 -5119 -314 -5120 0
 5117  5118 -5119 -314  5121 0
 5117  5118 -5119 -314 -5122 0

c  2+1 --> break 
c    (-b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧  p_314) -> break
c  in CNF:
c     b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ -p_314 ∨ break
c  in DIMACS:
 5117 -5118  5119 -314 1162 0


c  2-1 --> 1
c    (-b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧ -p_314) -> (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0)
c  in CNF:
c     b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_2
c     b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_1
c     b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨  b^{2, 158}_0
c  in DIMACS:
 5117 -5118  5119  314 -5120 0
 5117 -5118  5119  314 -5121 0
 5117 -5118  5119  314  5122 0

c  1-1 --> 0
c    (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0 ∧ -p_314) -> (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧ -b^{2, 158}_0)
c  in CNF:
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_2
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_1
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_0
c  in DIMACS:
 5117  5118 -5119  314 -5120 0
 5117  5118 -5119  314 -5121 0
 5117  5118 -5119  314 -5122 0

c  0-1 --> -1
c    (-b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧ -p_314) -> ( b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0)
c  in CNF:
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨  b^{2, 158}_2
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_1
c     b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨  b^{2, 158}_0
c  in DIMACS:
 5117  5118  5119  314  5120 0
 5117  5118  5119  314 -5121 0
 5117  5118  5119  314  5122 0

c  -1-1 --> -2
c    ( b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧  b^{2, 157}_0 ∧ -p_314) -> ( b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0)
c  in CNF:
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨  b^{2, 158}_2
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨  b^{2, 158}_1
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨  p_314 ∨ -b^{2, 158}_0
c  in DIMACS:
-5117  5118 -5119  314  5120 0
-5117  5118 -5119  314  5121 0
-5117  5118 -5119  314 -5122 0

c  -2-1 --> break 
c    ( b^{2, 157}_2 ∧  b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧ -p_314) -> break
c  in CNF:
c    -b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨  b^{2, 157}_0 ∨  p_314 ∨ break
c  in DIMACS:
-5117 -5118  5119  314 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 157}_2 ∧ -b^{2, 157}_1 ∧ -b^{2, 157}_0 ∧ true) 
c  in CNF:
c    -b^{2, 157}_2 ∨  b^{2, 157}_1 ∨  b^{2, 157}_0 ∨ false 
c  in DIMACS:
-5117  5118  5119  0

c  3 does not represent an automaton state.
c    -(-b^{2, 157}_2 ∧  b^{2, 157}_1 ∧  b^{2, 157}_0 ∧ true) 
c  in CNF:
c     b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ false 
c  in DIMACS:
 5117 -5118 -5119  0
c  -3 does not represent an automaton state.
c    -( b^{2, 157}_2 ∧  b^{2, 157}_1 ∧  b^{2, 157}_0 ∧ true) 
c  in CNF:
c    -b^{2, 157}_2 ∨ -b^{2, 157}_1 ∨ -b^{2, 157}_0 ∨ false 
c  in DIMACS:
-5117 -5118 -5119  0

c i = 158
c  -2+1 --> -1
c    ( b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧  p_316) -> ( b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0)
c  in CNF:
c    -b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨  b^{2, 159}_2
c    -b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_1
c    -b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨  b^{2, 159}_0
c  in DIMACS:
-5120 -5121  5122 -316  5123 0
-5120 -5121  5122 -316 -5124 0
-5120 -5121  5122 -316  5125 0

c  -1+1 --> 0
c    ( b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0 ∧  p_316) -> (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧ -b^{2, 159}_0)
c  in CNF:
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_2
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_1
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_0
c  in DIMACS:
-5120  5121 -5122 -316 -5123 0
-5120  5121 -5122 -316 -5124 0
-5120  5121 -5122 -316 -5125 0

c  0+1 --> 1
c    (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧  p_316) -> (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0)
c  in CNF:
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_2
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_1
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨  b^{2, 159}_0
c  in DIMACS:
 5120  5121  5122 -316 -5123 0
 5120  5121  5122 -316 -5124 0
 5120  5121  5122 -316  5125 0

c  1+1 --> 2
c    (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0 ∧  p_316) -> (-b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0)
c  in CNF:
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_2
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨  b^{2, 159}_1
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ -p_316 ∨ -b^{2, 159}_0
c  in DIMACS:
 5120  5121 -5122 -316 -5123 0
 5120  5121 -5122 -316  5124 0
 5120  5121 -5122 -316 -5125 0

c  2+1 --> break 
c    (-b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧  p_316) -> break
c  in CNF:
c     b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 5120 -5121  5122 -316 1162 0


c  2-1 --> 1
c    (-b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧ -p_316) -> (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0)
c  in CNF:
c     b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_2
c     b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_1
c     b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨  b^{2, 159}_0
c  in DIMACS:
 5120 -5121  5122  316 -5123 0
 5120 -5121  5122  316 -5124 0
 5120 -5121  5122  316  5125 0

c  1-1 --> 0
c    (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0 ∧ -p_316) -> (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧ -b^{2, 159}_0)
c  in CNF:
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_2
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_1
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_0
c  in DIMACS:
 5120  5121 -5122  316 -5123 0
 5120  5121 -5122  316 -5124 0
 5120  5121 -5122  316 -5125 0

c  0-1 --> -1
c    (-b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧ -p_316) -> ( b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0)
c  in CNF:
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨  b^{2, 159}_2
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_1
c     b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨  b^{2, 159}_0
c  in DIMACS:
 5120  5121  5122  316  5123 0
 5120  5121  5122  316 -5124 0
 5120  5121  5122  316  5125 0

c  -1-1 --> -2
c    ( b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧  b^{2, 158}_0 ∧ -p_316) -> ( b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0)
c  in CNF:
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨  b^{2, 159}_2
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨  b^{2, 159}_1
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨  p_316 ∨ -b^{2, 159}_0
c  in DIMACS:
-5120  5121 -5122  316  5123 0
-5120  5121 -5122  316  5124 0
-5120  5121 -5122  316 -5125 0

c  -2-1 --> break 
c    ( b^{2, 158}_2 ∧  b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨  b^{2, 158}_0 ∨  p_316 ∨ break
c  in DIMACS:
-5120 -5121  5122  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 158}_2 ∧ -b^{2, 158}_1 ∧ -b^{2, 158}_0 ∧ true) 
c  in CNF:
c    -b^{2, 158}_2 ∨  b^{2, 158}_1 ∨  b^{2, 158}_0 ∨ false 
c  in DIMACS:
-5120  5121  5122  0

c  3 does not represent an automaton state.
c    -(-b^{2, 158}_2 ∧  b^{2, 158}_1 ∧  b^{2, 158}_0 ∧ true) 
c  in CNF:
c     b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ false 
c  in DIMACS:
 5120 -5121 -5122  0
c  -3 does not represent an automaton state.
c    -( b^{2, 158}_2 ∧  b^{2, 158}_1 ∧  b^{2, 158}_0 ∧ true) 
c  in CNF:
c    -b^{2, 158}_2 ∨ -b^{2, 158}_1 ∨ -b^{2, 158}_0 ∨ false 
c  in DIMACS:
-5120 -5121 -5122  0

c i = 159
c  -2+1 --> -1
c    ( b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧  p_318) -> ( b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0)
c  in CNF:
c    -b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨  b^{2, 160}_2
c    -b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_1
c    -b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨  b^{2, 160}_0
c  in DIMACS:
-5123 -5124  5125 -318  5126 0
-5123 -5124  5125 -318 -5127 0
-5123 -5124  5125 -318  5128 0

c  -1+1 --> 0
c    ( b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0 ∧  p_318) -> (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧ -b^{2, 160}_0)
c  in CNF:
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_2
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_1
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_0
c  in DIMACS:
-5123  5124 -5125 -318 -5126 0
-5123  5124 -5125 -318 -5127 0
-5123  5124 -5125 -318 -5128 0

c  0+1 --> 1
c    (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧  p_318) -> (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0)
c  in CNF:
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_2
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_1
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨  b^{2, 160}_0
c  in DIMACS:
 5123  5124  5125 -318 -5126 0
 5123  5124  5125 -318 -5127 0
 5123  5124  5125 -318  5128 0

c  1+1 --> 2
c    (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0 ∧  p_318) -> (-b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0)
c  in CNF:
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_2
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨  b^{2, 160}_1
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ -p_318 ∨ -b^{2, 160}_0
c  in DIMACS:
 5123  5124 -5125 -318 -5126 0
 5123  5124 -5125 -318  5127 0
 5123  5124 -5125 -318 -5128 0

c  2+1 --> break 
c    (-b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧  p_318) -> break
c  in CNF:
c     b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 5123 -5124  5125 -318 1162 0


c  2-1 --> 1
c    (-b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧ -p_318) -> (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0)
c  in CNF:
c     b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_2
c     b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_1
c     b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨  b^{2, 160}_0
c  in DIMACS:
 5123 -5124  5125  318 -5126 0
 5123 -5124  5125  318 -5127 0
 5123 -5124  5125  318  5128 0

c  1-1 --> 0
c    (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0 ∧ -p_318) -> (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧ -b^{2, 160}_0)
c  in CNF:
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_2
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_1
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_0
c  in DIMACS:
 5123  5124 -5125  318 -5126 0
 5123  5124 -5125  318 -5127 0
 5123  5124 -5125  318 -5128 0

c  0-1 --> -1
c    (-b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧ -p_318) -> ( b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0)
c  in CNF:
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨  b^{2, 160}_2
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_1
c     b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨  b^{2, 160}_0
c  in DIMACS:
 5123  5124  5125  318  5126 0
 5123  5124  5125  318 -5127 0
 5123  5124  5125  318  5128 0

c  -1-1 --> -2
c    ( b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧  b^{2, 159}_0 ∧ -p_318) -> ( b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0)
c  in CNF:
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨  b^{2, 160}_2
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨  b^{2, 160}_1
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨  p_318 ∨ -b^{2, 160}_0
c  in DIMACS:
-5123  5124 -5125  318  5126 0
-5123  5124 -5125  318  5127 0
-5123  5124 -5125  318 -5128 0

c  -2-1 --> break 
c    ( b^{2, 159}_2 ∧  b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨  b^{2, 159}_0 ∨  p_318 ∨ break
c  in DIMACS:
-5123 -5124  5125  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 159}_2 ∧ -b^{2, 159}_1 ∧ -b^{2, 159}_0 ∧ true) 
c  in CNF:
c    -b^{2, 159}_2 ∨  b^{2, 159}_1 ∨  b^{2, 159}_0 ∨ false 
c  in DIMACS:
-5123  5124  5125  0

c  3 does not represent an automaton state.
c    -(-b^{2, 159}_2 ∧  b^{2, 159}_1 ∧  b^{2, 159}_0 ∧ true) 
c  in CNF:
c     b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ false 
c  in DIMACS:
 5123 -5124 -5125  0
c  -3 does not represent an automaton state.
c    -( b^{2, 159}_2 ∧  b^{2, 159}_1 ∧  b^{2, 159}_0 ∧ true) 
c  in CNF:
c    -b^{2, 159}_2 ∨ -b^{2, 159}_1 ∨ -b^{2, 159}_0 ∨ false 
c  in DIMACS:
-5123 -5124 -5125  0

c i = 160
c  -2+1 --> -1
c    ( b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧  p_320) -> ( b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0)
c  in CNF:
c    -b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨  b^{2, 161}_2
c    -b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_1
c    -b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨  b^{2, 161}_0
c  in DIMACS:
-5126 -5127  5128 -320  5129 0
-5126 -5127  5128 -320 -5130 0
-5126 -5127  5128 -320  5131 0

c  -1+1 --> 0
c    ( b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0 ∧  p_320) -> (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧ -b^{2, 161}_0)
c  in CNF:
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_2
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_1
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_0
c  in DIMACS:
-5126  5127 -5128 -320 -5129 0
-5126  5127 -5128 -320 -5130 0
-5126  5127 -5128 -320 -5131 0

c  0+1 --> 1
c    (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧  p_320) -> (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0)
c  in CNF:
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_2
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_1
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨  b^{2, 161}_0
c  in DIMACS:
 5126  5127  5128 -320 -5129 0
 5126  5127  5128 -320 -5130 0
 5126  5127  5128 -320  5131 0

c  1+1 --> 2
c    (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0 ∧  p_320) -> (-b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0)
c  in CNF:
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_2
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨  b^{2, 161}_1
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ -p_320 ∨ -b^{2, 161}_0
c  in DIMACS:
 5126  5127 -5128 -320 -5129 0
 5126  5127 -5128 -320  5130 0
 5126  5127 -5128 -320 -5131 0

c  2+1 --> break 
c    (-b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧  p_320) -> break
c  in CNF:
c     b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 5126 -5127  5128 -320 1162 0


c  2-1 --> 1
c    (-b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧ -p_320) -> (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0)
c  in CNF:
c     b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_2
c     b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_1
c     b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨  b^{2, 161}_0
c  in DIMACS:
 5126 -5127  5128  320 -5129 0
 5126 -5127  5128  320 -5130 0
 5126 -5127  5128  320  5131 0

c  1-1 --> 0
c    (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0 ∧ -p_320) -> (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧ -b^{2, 161}_0)
c  in CNF:
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_2
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_1
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_0
c  in DIMACS:
 5126  5127 -5128  320 -5129 0
 5126  5127 -5128  320 -5130 0
 5126  5127 -5128  320 -5131 0

c  0-1 --> -1
c    (-b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧ -p_320) -> ( b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0)
c  in CNF:
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨  b^{2, 161}_2
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_1
c     b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨  b^{2, 161}_0
c  in DIMACS:
 5126  5127  5128  320  5129 0
 5126  5127  5128  320 -5130 0
 5126  5127  5128  320  5131 0

c  -1-1 --> -2
c    ( b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧  b^{2, 160}_0 ∧ -p_320) -> ( b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0)
c  in CNF:
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨  b^{2, 161}_2
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨  b^{2, 161}_1
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨  p_320 ∨ -b^{2, 161}_0
c  in DIMACS:
-5126  5127 -5128  320  5129 0
-5126  5127 -5128  320  5130 0
-5126  5127 -5128  320 -5131 0

c  -2-1 --> break 
c    ( b^{2, 160}_2 ∧  b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨  b^{2, 160}_0 ∨  p_320 ∨ break
c  in DIMACS:
-5126 -5127  5128  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 160}_2 ∧ -b^{2, 160}_1 ∧ -b^{2, 160}_0 ∧ true) 
c  in CNF:
c    -b^{2, 160}_2 ∨  b^{2, 160}_1 ∨  b^{2, 160}_0 ∨ false 
c  in DIMACS:
-5126  5127  5128  0

c  3 does not represent an automaton state.
c    -(-b^{2, 160}_2 ∧  b^{2, 160}_1 ∧  b^{2, 160}_0 ∧ true) 
c  in CNF:
c     b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ false 
c  in DIMACS:
 5126 -5127 -5128  0
c  -3 does not represent an automaton state.
c    -( b^{2, 160}_2 ∧  b^{2, 160}_1 ∧  b^{2, 160}_0 ∧ true) 
c  in CNF:
c    -b^{2, 160}_2 ∨ -b^{2, 160}_1 ∨ -b^{2, 160}_0 ∨ false 
c  in DIMACS:
-5126 -5127 -5128  0

c i = 161
c  -2+1 --> -1
c    ( b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧  p_322) -> ( b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0)
c  in CNF:
c    -b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨  b^{2, 162}_2
c    -b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_1
c    -b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨  b^{2, 162}_0
c  in DIMACS:
-5129 -5130  5131 -322  5132 0
-5129 -5130  5131 -322 -5133 0
-5129 -5130  5131 -322  5134 0

c  -1+1 --> 0
c    ( b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0 ∧  p_322) -> (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧ -b^{2, 162}_0)
c  in CNF:
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_2
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_1
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_0
c  in DIMACS:
-5129  5130 -5131 -322 -5132 0
-5129  5130 -5131 -322 -5133 0
-5129  5130 -5131 -322 -5134 0

c  0+1 --> 1
c    (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧  p_322) -> (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0)
c  in CNF:
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_2
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_1
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨  b^{2, 162}_0
c  in DIMACS:
 5129  5130  5131 -322 -5132 0
 5129  5130  5131 -322 -5133 0
 5129  5130  5131 -322  5134 0

c  1+1 --> 2
c    (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0 ∧  p_322) -> (-b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0)
c  in CNF:
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_2
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨  b^{2, 162}_1
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ -p_322 ∨ -b^{2, 162}_0
c  in DIMACS:
 5129  5130 -5131 -322 -5132 0
 5129  5130 -5131 -322  5133 0
 5129  5130 -5131 -322 -5134 0

c  2+1 --> break 
c    (-b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧  p_322) -> break
c  in CNF:
c     b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 5129 -5130  5131 -322 1162 0


c  2-1 --> 1
c    (-b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧ -p_322) -> (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0)
c  in CNF:
c     b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_2
c     b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_1
c     b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨  b^{2, 162}_0
c  in DIMACS:
 5129 -5130  5131  322 -5132 0
 5129 -5130  5131  322 -5133 0
 5129 -5130  5131  322  5134 0

c  1-1 --> 0
c    (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0 ∧ -p_322) -> (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧ -b^{2, 162}_0)
c  in CNF:
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_2
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_1
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_0
c  in DIMACS:
 5129  5130 -5131  322 -5132 0
 5129  5130 -5131  322 -5133 0
 5129  5130 -5131  322 -5134 0

c  0-1 --> -1
c    (-b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧ -p_322) -> ( b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0)
c  in CNF:
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨  b^{2, 162}_2
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_1
c     b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨  b^{2, 162}_0
c  in DIMACS:
 5129  5130  5131  322  5132 0
 5129  5130  5131  322 -5133 0
 5129  5130  5131  322  5134 0

c  -1-1 --> -2
c    ( b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧  b^{2, 161}_0 ∧ -p_322) -> ( b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0)
c  in CNF:
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨  b^{2, 162}_2
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨  b^{2, 162}_1
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨  p_322 ∨ -b^{2, 162}_0
c  in DIMACS:
-5129  5130 -5131  322  5132 0
-5129  5130 -5131  322  5133 0
-5129  5130 -5131  322 -5134 0

c  -2-1 --> break 
c    ( b^{2, 161}_2 ∧  b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨  b^{2, 161}_0 ∨  p_322 ∨ break
c  in DIMACS:
-5129 -5130  5131  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 161}_2 ∧ -b^{2, 161}_1 ∧ -b^{2, 161}_0 ∧ true) 
c  in CNF:
c    -b^{2, 161}_2 ∨  b^{2, 161}_1 ∨  b^{2, 161}_0 ∨ false 
c  in DIMACS:
-5129  5130  5131  0

c  3 does not represent an automaton state.
c    -(-b^{2, 161}_2 ∧  b^{2, 161}_1 ∧  b^{2, 161}_0 ∧ true) 
c  in CNF:
c     b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ false 
c  in DIMACS:
 5129 -5130 -5131  0
c  -3 does not represent an automaton state.
c    -( b^{2, 161}_2 ∧  b^{2, 161}_1 ∧  b^{2, 161}_0 ∧ true) 
c  in CNF:
c    -b^{2, 161}_2 ∨ -b^{2, 161}_1 ∨ -b^{2, 161}_0 ∨ false 
c  in DIMACS:
-5129 -5130 -5131  0

c i = 162
c  -2+1 --> -1
c    ( b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧  p_324) -> ( b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0)
c  in CNF:
c    -b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨  b^{2, 163}_2
c    -b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_1
c    -b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨  b^{2, 163}_0
c  in DIMACS:
-5132 -5133  5134 -324  5135 0
-5132 -5133  5134 -324 -5136 0
-5132 -5133  5134 -324  5137 0

c  -1+1 --> 0
c    ( b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0 ∧  p_324) -> (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧ -b^{2, 163}_0)
c  in CNF:
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_2
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_1
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_0
c  in DIMACS:
-5132  5133 -5134 -324 -5135 0
-5132  5133 -5134 -324 -5136 0
-5132  5133 -5134 -324 -5137 0

c  0+1 --> 1
c    (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧  p_324) -> (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0)
c  in CNF:
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_2
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_1
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨  b^{2, 163}_0
c  in DIMACS:
 5132  5133  5134 -324 -5135 0
 5132  5133  5134 -324 -5136 0
 5132  5133  5134 -324  5137 0

c  1+1 --> 2
c    (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0 ∧  p_324) -> (-b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0)
c  in CNF:
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_2
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨  b^{2, 163}_1
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ -p_324 ∨ -b^{2, 163}_0
c  in DIMACS:
 5132  5133 -5134 -324 -5135 0
 5132  5133 -5134 -324  5136 0
 5132  5133 -5134 -324 -5137 0

c  2+1 --> break 
c    (-b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧  p_324) -> break
c  in CNF:
c     b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 5132 -5133  5134 -324 1162 0


c  2-1 --> 1
c    (-b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧ -p_324) -> (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0)
c  in CNF:
c     b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_2
c     b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_1
c     b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨  b^{2, 163}_0
c  in DIMACS:
 5132 -5133  5134  324 -5135 0
 5132 -5133  5134  324 -5136 0
 5132 -5133  5134  324  5137 0

c  1-1 --> 0
c    (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0 ∧ -p_324) -> (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧ -b^{2, 163}_0)
c  in CNF:
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_2
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_1
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_0
c  in DIMACS:
 5132  5133 -5134  324 -5135 0
 5132  5133 -5134  324 -5136 0
 5132  5133 -5134  324 -5137 0

c  0-1 --> -1
c    (-b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧ -p_324) -> ( b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0)
c  in CNF:
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨  b^{2, 163}_2
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_1
c     b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨  b^{2, 163}_0
c  in DIMACS:
 5132  5133  5134  324  5135 0
 5132  5133  5134  324 -5136 0
 5132  5133  5134  324  5137 0

c  -1-1 --> -2
c    ( b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧  b^{2, 162}_0 ∧ -p_324) -> ( b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0)
c  in CNF:
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨  b^{2, 163}_2
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨  b^{2, 163}_1
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨  p_324 ∨ -b^{2, 163}_0
c  in DIMACS:
-5132  5133 -5134  324  5135 0
-5132  5133 -5134  324  5136 0
-5132  5133 -5134  324 -5137 0

c  -2-1 --> break 
c    ( b^{2, 162}_2 ∧  b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨  b^{2, 162}_0 ∨  p_324 ∨ break
c  in DIMACS:
-5132 -5133  5134  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 162}_2 ∧ -b^{2, 162}_1 ∧ -b^{2, 162}_0 ∧ true) 
c  in CNF:
c    -b^{2, 162}_2 ∨  b^{2, 162}_1 ∨  b^{2, 162}_0 ∨ false 
c  in DIMACS:
-5132  5133  5134  0

c  3 does not represent an automaton state.
c    -(-b^{2, 162}_2 ∧  b^{2, 162}_1 ∧  b^{2, 162}_0 ∧ true) 
c  in CNF:
c     b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ false 
c  in DIMACS:
 5132 -5133 -5134  0
c  -3 does not represent an automaton state.
c    -( b^{2, 162}_2 ∧  b^{2, 162}_1 ∧  b^{2, 162}_0 ∧ true) 
c  in CNF:
c    -b^{2, 162}_2 ∨ -b^{2, 162}_1 ∨ -b^{2, 162}_0 ∨ false 
c  in DIMACS:
-5132 -5133 -5134  0

c i = 163
c  -2+1 --> -1
c    ( b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧  p_326) -> ( b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0)
c  in CNF:
c    -b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨  b^{2, 164}_2
c    -b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_1
c    -b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨  b^{2, 164}_0
c  in DIMACS:
-5135 -5136  5137 -326  5138 0
-5135 -5136  5137 -326 -5139 0
-5135 -5136  5137 -326  5140 0

c  -1+1 --> 0
c    ( b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0 ∧  p_326) -> (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧ -b^{2, 164}_0)
c  in CNF:
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_2
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_1
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_0
c  in DIMACS:
-5135  5136 -5137 -326 -5138 0
-5135  5136 -5137 -326 -5139 0
-5135  5136 -5137 -326 -5140 0

c  0+1 --> 1
c    (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧  p_326) -> (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0)
c  in CNF:
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_2
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_1
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨  b^{2, 164}_0
c  in DIMACS:
 5135  5136  5137 -326 -5138 0
 5135  5136  5137 -326 -5139 0
 5135  5136  5137 -326  5140 0

c  1+1 --> 2
c    (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0 ∧  p_326) -> (-b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0)
c  in CNF:
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_2
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨  b^{2, 164}_1
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ -p_326 ∨ -b^{2, 164}_0
c  in DIMACS:
 5135  5136 -5137 -326 -5138 0
 5135  5136 -5137 -326  5139 0
 5135  5136 -5137 -326 -5140 0

c  2+1 --> break 
c    (-b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧  p_326) -> break
c  in CNF:
c     b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ -p_326 ∨ break
c  in DIMACS:
 5135 -5136  5137 -326 1162 0


c  2-1 --> 1
c    (-b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧ -p_326) -> (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0)
c  in CNF:
c     b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_2
c     b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_1
c     b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨  b^{2, 164}_0
c  in DIMACS:
 5135 -5136  5137  326 -5138 0
 5135 -5136  5137  326 -5139 0
 5135 -5136  5137  326  5140 0

c  1-1 --> 0
c    (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0 ∧ -p_326) -> (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧ -b^{2, 164}_0)
c  in CNF:
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_2
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_1
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_0
c  in DIMACS:
 5135  5136 -5137  326 -5138 0
 5135  5136 -5137  326 -5139 0
 5135  5136 -5137  326 -5140 0

c  0-1 --> -1
c    (-b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧ -p_326) -> ( b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0)
c  in CNF:
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨  b^{2, 164}_2
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_1
c     b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨  b^{2, 164}_0
c  in DIMACS:
 5135  5136  5137  326  5138 0
 5135  5136  5137  326 -5139 0
 5135  5136  5137  326  5140 0

c  -1-1 --> -2
c    ( b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧  b^{2, 163}_0 ∧ -p_326) -> ( b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0)
c  in CNF:
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨  b^{2, 164}_2
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨  b^{2, 164}_1
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨  p_326 ∨ -b^{2, 164}_0
c  in DIMACS:
-5135  5136 -5137  326  5138 0
-5135  5136 -5137  326  5139 0
-5135  5136 -5137  326 -5140 0

c  -2-1 --> break 
c    ( b^{2, 163}_2 ∧  b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧ -p_326) -> break
c  in CNF:
c    -b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨  b^{2, 163}_0 ∨  p_326 ∨ break
c  in DIMACS:
-5135 -5136  5137  326 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 163}_2 ∧ -b^{2, 163}_1 ∧ -b^{2, 163}_0 ∧ true) 
c  in CNF:
c    -b^{2, 163}_2 ∨  b^{2, 163}_1 ∨  b^{2, 163}_0 ∨ false 
c  in DIMACS:
-5135  5136  5137  0

c  3 does not represent an automaton state.
c    -(-b^{2, 163}_2 ∧  b^{2, 163}_1 ∧  b^{2, 163}_0 ∧ true) 
c  in CNF:
c     b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ false 
c  in DIMACS:
 5135 -5136 -5137  0
c  -3 does not represent an automaton state.
c    -( b^{2, 163}_2 ∧  b^{2, 163}_1 ∧  b^{2, 163}_0 ∧ true) 
c  in CNF:
c    -b^{2, 163}_2 ∨ -b^{2, 163}_1 ∨ -b^{2, 163}_0 ∨ false 
c  in DIMACS:
-5135 -5136 -5137  0

c i = 164
c  -2+1 --> -1
c    ( b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧  p_328) -> ( b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0)
c  in CNF:
c    -b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨  b^{2, 165}_2
c    -b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_1
c    -b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨  b^{2, 165}_0
c  in DIMACS:
-5138 -5139  5140 -328  5141 0
-5138 -5139  5140 -328 -5142 0
-5138 -5139  5140 -328  5143 0

c  -1+1 --> 0
c    ( b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0 ∧  p_328) -> (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧ -b^{2, 165}_0)
c  in CNF:
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_2
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_1
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_0
c  in DIMACS:
-5138  5139 -5140 -328 -5141 0
-5138  5139 -5140 -328 -5142 0
-5138  5139 -5140 -328 -5143 0

c  0+1 --> 1
c    (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧  p_328) -> (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0)
c  in CNF:
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_2
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_1
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨  b^{2, 165}_0
c  in DIMACS:
 5138  5139  5140 -328 -5141 0
 5138  5139  5140 -328 -5142 0
 5138  5139  5140 -328  5143 0

c  1+1 --> 2
c    (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0 ∧  p_328) -> (-b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0)
c  in CNF:
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_2
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨  b^{2, 165}_1
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ -p_328 ∨ -b^{2, 165}_0
c  in DIMACS:
 5138  5139 -5140 -328 -5141 0
 5138  5139 -5140 -328  5142 0
 5138  5139 -5140 -328 -5143 0

c  2+1 --> break 
c    (-b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧  p_328) -> break
c  in CNF:
c     b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 5138 -5139  5140 -328 1162 0


c  2-1 --> 1
c    (-b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧ -p_328) -> (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0)
c  in CNF:
c     b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_2
c     b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_1
c     b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨  b^{2, 165}_0
c  in DIMACS:
 5138 -5139  5140  328 -5141 0
 5138 -5139  5140  328 -5142 0
 5138 -5139  5140  328  5143 0

c  1-1 --> 0
c    (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0 ∧ -p_328) -> (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧ -b^{2, 165}_0)
c  in CNF:
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_2
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_1
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_0
c  in DIMACS:
 5138  5139 -5140  328 -5141 0
 5138  5139 -5140  328 -5142 0
 5138  5139 -5140  328 -5143 0

c  0-1 --> -1
c    (-b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧ -p_328) -> ( b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0)
c  in CNF:
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨  b^{2, 165}_2
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_1
c     b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨  b^{2, 165}_0
c  in DIMACS:
 5138  5139  5140  328  5141 0
 5138  5139  5140  328 -5142 0
 5138  5139  5140  328  5143 0

c  -1-1 --> -2
c    ( b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧  b^{2, 164}_0 ∧ -p_328) -> ( b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0)
c  in CNF:
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨  b^{2, 165}_2
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨  b^{2, 165}_1
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨  p_328 ∨ -b^{2, 165}_0
c  in DIMACS:
-5138  5139 -5140  328  5141 0
-5138  5139 -5140  328  5142 0
-5138  5139 -5140  328 -5143 0

c  -2-1 --> break 
c    ( b^{2, 164}_2 ∧  b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨  b^{2, 164}_0 ∨  p_328 ∨ break
c  in DIMACS:
-5138 -5139  5140  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 164}_2 ∧ -b^{2, 164}_1 ∧ -b^{2, 164}_0 ∧ true) 
c  in CNF:
c    -b^{2, 164}_2 ∨  b^{2, 164}_1 ∨  b^{2, 164}_0 ∨ false 
c  in DIMACS:
-5138  5139  5140  0

c  3 does not represent an automaton state.
c    -(-b^{2, 164}_2 ∧  b^{2, 164}_1 ∧  b^{2, 164}_0 ∧ true) 
c  in CNF:
c     b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ false 
c  in DIMACS:
 5138 -5139 -5140  0
c  -3 does not represent an automaton state.
c    -( b^{2, 164}_2 ∧  b^{2, 164}_1 ∧  b^{2, 164}_0 ∧ true) 
c  in CNF:
c    -b^{2, 164}_2 ∨ -b^{2, 164}_1 ∨ -b^{2, 164}_0 ∨ false 
c  in DIMACS:
-5138 -5139 -5140  0

c i = 165
c  -2+1 --> -1
c    ( b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧  p_330) -> ( b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0)
c  in CNF:
c    -b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨  b^{2, 166}_2
c    -b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_1
c    -b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨  b^{2, 166}_0
c  in DIMACS:
-5141 -5142  5143 -330  5144 0
-5141 -5142  5143 -330 -5145 0
-5141 -5142  5143 -330  5146 0

c  -1+1 --> 0
c    ( b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0 ∧  p_330) -> (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧ -b^{2, 166}_0)
c  in CNF:
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_2
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_1
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_0
c  in DIMACS:
-5141  5142 -5143 -330 -5144 0
-5141  5142 -5143 -330 -5145 0
-5141  5142 -5143 -330 -5146 0

c  0+1 --> 1
c    (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧  p_330) -> (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0)
c  in CNF:
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_2
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_1
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨  b^{2, 166}_0
c  in DIMACS:
 5141  5142  5143 -330 -5144 0
 5141  5142  5143 -330 -5145 0
 5141  5142  5143 -330  5146 0

c  1+1 --> 2
c    (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0 ∧  p_330) -> (-b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0)
c  in CNF:
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_2
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨  b^{2, 166}_1
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ -p_330 ∨ -b^{2, 166}_0
c  in DIMACS:
 5141  5142 -5143 -330 -5144 0
 5141  5142 -5143 -330  5145 0
 5141  5142 -5143 -330 -5146 0

c  2+1 --> break 
c    (-b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧  p_330) -> break
c  in CNF:
c     b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 5141 -5142  5143 -330 1162 0


c  2-1 --> 1
c    (-b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧ -p_330) -> (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0)
c  in CNF:
c     b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_2
c     b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_1
c     b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨  b^{2, 166}_0
c  in DIMACS:
 5141 -5142  5143  330 -5144 0
 5141 -5142  5143  330 -5145 0
 5141 -5142  5143  330  5146 0

c  1-1 --> 0
c    (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0 ∧ -p_330) -> (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧ -b^{2, 166}_0)
c  in CNF:
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_2
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_1
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_0
c  in DIMACS:
 5141  5142 -5143  330 -5144 0
 5141  5142 -5143  330 -5145 0
 5141  5142 -5143  330 -5146 0

c  0-1 --> -1
c    (-b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧ -p_330) -> ( b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0)
c  in CNF:
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨  b^{2, 166}_2
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_1
c     b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨  b^{2, 166}_0
c  in DIMACS:
 5141  5142  5143  330  5144 0
 5141  5142  5143  330 -5145 0
 5141  5142  5143  330  5146 0

c  -1-1 --> -2
c    ( b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧  b^{2, 165}_0 ∧ -p_330) -> ( b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0)
c  in CNF:
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨  b^{2, 166}_2
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨  b^{2, 166}_1
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨  p_330 ∨ -b^{2, 166}_0
c  in DIMACS:
-5141  5142 -5143  330  5144 0
-5141  5142 -5143  330  5145 0
-5141  5142 -5143  330 -5146 0

c  -2-1 --> break 
c    ( b^{2, 165}_2 ∧  b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨  b^{2, 165}_0 ∨  p_330 ∨ break
c  in DIMACS:
-5141 -5142  5143  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 165}_2 ∧ -b^{2, 165}_1 ∧ -b^{2, 165}_0 ∧ true) 
c  in CNF:
c    -b^{2, 165}_2 ∨  b^{2, 165}_1 ∨  b^{2, 165}_0 ∨ false 
c  in DIMACS:
-5141  5142  5143  0

c  3 does not represent an automaton state.
c    -(-b^{2, 165}_2 ∧  b^{2, 165}_1 ∧  b^{2, 165}_0 ∧ true) 
c  in CNF:
c     b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ false 
c  in DIMACS:
 5141 -5142 -5143  0
c  -3 does not represent an automaton state.
c    -( b^{2, 165}_2 ∧  b^{2, 165}_1 ∧  b^{2, 165}_0 ∧ true) 
c  in CNF:
c    -b^{2, 165}_2 ∨ -b^{2, 165}_1 ∨ -b^{2, 165}_0 ∨ false 
c  in DIMACS:
-5141 -5142 -5143  0

c i = 166
c  -2+1 --> -1
c    ( b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧  p_332) -> ( b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0)
c  in CNF:
c    -b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨  b^{2, 167}_2
c    -b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_1
c    -b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨  b^{2, 167}_0
c  in DIMACS:
-5144 -5145  5146 -332  5147 0
-5144 -5145  5146 -332 -5148 0
-5144 -5145  5146 -332  5149 0

c  -1+1 --> 0
c    ( b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0 ∧  p_332) -> (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧ -b^{2, 167}_0)
c  in CNF:
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_2
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_1
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_0
c  in DIMACS:
-5144  5145 -5146 -332 -5147 0
-5144  5145 -5146 -332 -5148 0
-5144  5145 -5146 -332 -5149 0

c  0+1 --> 1
c    (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧  p_332) -> (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0)
c  in CNF:
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_2
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_1
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨  b^{2, 167}_0
c  in DIMACS:
 5144  5145  5146 -332 -5147 0
 5144  5145  5146 -332 -5148 0
 5144  5145  5146 -332  5149 0

c  1+1 --> 2
c    (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0 ∧  p_332) -> (-b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0)
c  in CNF:
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_2
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨  b^{2, 167}_1
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ -p_332 ∨ -b^{2, 167}_0
c  in DIMACS:
 5144  5145 -5146 -332 -5147 0
 5144  5145 -5146 -332  5148 0
 5144  5145 -5146 -332 -5149 0

c  2+1 --> break 
c    (-b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧  p_332) -> break
c  in CNF:
c     b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 5144 -5145  5146 -332 1162 0


c  2-1 --> 1
c    (-b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧ -p_332) -> (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0)
c  in CNF:
c     b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_2
c     b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_1
c     b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨  b^{2, 167}_0
c  in DIMACS:
 5144 -5145  5146  332 -5147 0
 5144 -5145  5146  332 -5148 0
 5144 -5145  5146  332  5149 0

c  1-1 --> 0
c    (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0 ∧ -p_332) -> (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧ -b^{2, 167}_0)
c  in CNF:
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_2
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_1
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_0
c  in DIMACS:
 5144  5145 -5146  332 -5147 0
 5144  5145 -5146  332 -5148 0
 5144  5145 -5146  332 -5149 0

c  0-1 --> -1
c    (-b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧ -p_332) -> ( b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0)
c  in CNF:
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨  b^{2, 167}_2
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_1
c     b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨  b^{2, 167}_0
c  in DIMACS:
 5144  5145  5146  332  5147 0
 5144  5145  5146  332 -5148 0
 5144  5145  5146  332  5149 0

c  -1-1 --> -2
c    ( b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧  b^{2, 166}_0 ∧ -p_332) -> ( b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0)
c  in CNF:
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨  b^{2, 167}_2
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨  b^{2, 167}_1
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨  p_332 ∨ -b^{2, 167}_0
c  in DIMACS:
-5144  5145 -5146  332  5147 0
-5144  5145 -5146  332  5148 0
-5144  5145 -5146  332 -5149 0

c  -2-1 --> break 
c    ( b^{2, 166}_2 ∧  b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨  b^{2, 166}_0 ∨  p_332 ∨ break
c  in DIMACS:
-5144 -5145  5146  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 166}_2 ∧ -b^{2, 166}_1 ∧ -b^{2, 166}_0 ∧ true) 
c  in CNF:
c    -b^{2, 166}_2 ∨  b^{2, 166}_1 ∨  b^{2, 166}_0 ∨ false 
c  in DIMACS:
-5144  5145  5146  0

c  3 does not represent an automaton state.
c    -(-b^{2, 166}_2 ∧  b^{2, 166}_1 ∧  b^{2, 166}_0 ∧ true) 
c  in CNF:
c     b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ false 
c  in DIMACS:
 5144 -5145 -5146  0
c  -3 does not represent an automaton state.
c    -( b^{2, 166}_2 ∧  b^{2, 166}_1 ∧  b^{2, 166}_0 ∧ true) 
c  in CNF:
c    -b^{2, 166}_2 ∨ -b^{2, 166}_1 ∨ -b^{2, 166}_0 ∨ false 
c  in DIMACS:
-5144 -5145 -5146  0

c i = 167
c  -2+1 --> -1
c    ( b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧  p_334) -> ( b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0)
c  in CNF:
c    -b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨  b^{2, 168}_2
c    -b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_1
c    -b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨  b^{2, 168}_0
c  in DIMACS:
-5147 -5148  5149 -334  5150 0
-5147 -5148  5149 -334 -5151 0
-5147 -5148  5149 -334  5152 0

c  -1+1 --> 0
c    ( b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0 ∧  p_334) -> (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧ -b^{2, 168}_0)
c  in CNF:
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_2
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_1
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_0
c  in DIMACS:
-5147  5148 -5149 -334 -5150 0
-5147  5148 -5149 -334 -5151 0
-5147  5148 -5149 -334 -5152 0

c  0+1 --> 1
c    (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧  p_334) -> (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0)
c  in CNF:
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_2
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_1
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨  b^{2, 168}_0
c  in DIMACS:
 5147  5148  5149 -334 -5150 0
 5147  5148  5149 -334 -5151 0
 5147  5148  5149 -334  5152 0

c  1+1 --> 2
c    (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0 ∧  p_334) -> (-b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0)
c  in CNF:
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_2
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨  b^{2, 168}_1
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ -p_334 ∨ -b^{2, 168}_0
c  in DIMACS:
 5147  5148 -5149 -334 -5150 0
 5147  5148 -5149 -334  5151 0
 5147  5148 -5149 -334 -5152 0

c  2+1 --> break 
c    (-b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧  p_334) -> break
c  in CNF:
c     b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ -p_334 ∨ break
c  in DIMACS:
 5147 -5148  5149 -334 1162 0


c  2-1 --> 1
c    (-b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧ -p_334) -> (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0)
c  in CNF:
c     b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_2
c     b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_1
c     b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨  b^{2, 168}_0
c  in DIMACS:
 5147 -5148  5149  334 -5150 0
 5147 -5148  5149  334 -5151 0
 5147 -5148  5149  334  5152 0

c  1-1 --> 0
c    (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0 ∧ -p_334) -> (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧ -b^{2, 168}_0)
c  in CNF:
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_2
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_1
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_0
c  in DIMACS:
 5147  5148 -5149  334 -5150 0
 5147  5148 -5149  334 -5151 0
 5147  5148 -5149  334 -5152 0

c  0-1 --> -1
c    (-b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧ -p_334) -> ( b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0)
c  in CNF:
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨  b^{2, 168}_2
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_1
c     b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨  b^{2, 168}_0
c  in DIMACS:
 5147  5148  5149  334  5150 0
 5147  5148  5149  334 -5151 0
 5147  5148  5149  334  5152 0

c  -1-1 --> -2
c    ( b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧  b^{2, 167}_0 ∧ -p_334) -> ( b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0)
c  in CNF:
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨  b^{2, 168}_2
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨  b^{2, 168}_1
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨  p_334 ∨ -b^{2, 168}_0
c  in DIMACS:
-5147  5148 -5149  334  5150 0
-5147  5148 -5149  334  5151 0
-5147  5148 -5149  334 -5152 0

c  -2-1 --> break 
c    ( b^{2, 167}_2 ∧  b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧ -p_334) -> break
c  in CNF:
c    -b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨  b^{2, 167}_0 ∨  p_334 ∨ break
c  in DIMACS:
-5147 -5148  5149  334 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 167}_2 ∧ -b^{2, 167}_1 ∧ -b^{2, 167}_0 ∧ true) 
c  in CNF:
c    -b^{2, 167}_2 ∨  b^{2, 167}_1 ∨  b^{2, 167}_0 ∨ false 
c  in DIMACS:
-5147  5148  5149  0

c  3 does not represent an automaton state.
c    -(-b^{2, 167}_2 ∧  b^{2, 167}_1 ∧  b^{2, 167}_0 ∧ true) 
c  in CNF:
c     b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ false 
c  in DIMACS:
 5147 -5148 -5149  0
c  -3 does not represent an automaton state.
c    -( b^{2, 167}_2 ∧  b^{2, 167}_1 ∧  b^{2, 167}_0 ∧ true) 
c  in CNF:
c    -b^{2, 167}_2 ∨ -b^{2, 167}_1 ∨ -b^{2, 167}_0 ∨ false 
c  in DIMACS:
-5147 -5148 -5149  0

c i = 168
c  -2+1 --> -1
c    ( b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧  p_336) -> ( b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0)
c  in CNF:
c    -b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨  b^{2, 169}_2
c    -b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_1
c    -b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨  b^{2, 169}_0
c  in DIMACS:
-5150 -5151  5152 -336  5153 0
-5150 -5151  5152 -336 -5154 0
-5150 -5151  5152 -336  5155 0

c  -1+1 --> 0
c    ( b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0 ∧  p_336) -> (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧ -b^{2, 169}_0)
c  in CNF:
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_2
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_1
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_0
c  in DIMACS:
-5150  5151 -5152 -336 -5153 0
-5150  5151 -5152 -336 -5154 0
-5150  5151 -5152 -336 -5155 0

c  0+1 --> 1
c    (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧  p_336) -> (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0)
c  in CNF:
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_2
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_1
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨  b^{2, 169}_0
c  in DIMACS:
 5150  5151  5152 -336 -5153 0
 5150  5151  5152 -336 -5154 0
 5150  5151  5152 -336  5155 0

c  1+1 --> 2
c    (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0 ∧  p_336) -> (-b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0)
c  in CNF:
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_2
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨  b^{2, 169}_1
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ -p_336 ∨ -b^{2, 169}_0
c  in DIMACS:
 5150  5151 -5152 -336 -5153 0
 5150  5151 -5152 -336  5154 0
 5150  5151 -5152 -336 -5155 0

c  2+1 --> break 
c    (-b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧  p_336) -> break
c  in CNF:
c     b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 5150 -5151  5152 -336 1162 0


c  2-1 --> 1
c    (-b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧ -p_336) -> (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0)
c  in CNF:
c     b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_2
c     b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_1
c     b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨  b^{2, 169}_0
c  in DIMACS:
 5150 -5151  5152  336 -5153 0
 5150 -5151  5152  336 -5154 0
 5150 -5151  5152  336  5155 0

c  1-1 --> 0
c    (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0 ∧ -p_336) -> (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧ -b^{2, 169}_0)
c  in CNF:
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_2
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_1
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_0
c  in DIMACS:
 5150  5151 -5152  336 -5153 0
 5150  5151 -5152  336 -5154 0
 5150  5151 -5152  336 -5155 0

c  0-1 --> -1
c    (-b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧ -p_336) -> ( b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0)
c  in CNF:
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨  b^{2, 169}_2
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_1
c     b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨  b^{2, 169}_0
c  in DIMACS:
 5150  5151  5152  336  5153 0
 5150  5151  5152  336 -5154 0
 5150  5151  5152  336  5155 0

c  -1-1 --> -2
c    ( b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧  b^{2, 168}_0 ∧ -p_336) -> ( b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0)
c  in CNF:
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨  b^{2, 169}_2
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨  b^{2, 169}_1
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨  p_336 ∨ -b^{2, 169}_0
c  in DIMACS:
-5150  5151 -5152  336  5153 0
-5150  5151 -5152  336  5154 0
-5150  5151 -5152  336 -5155 0

c  -2-1 --> break 
c    ( b^{2, 168}_2 ∧  b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨  b^{2, 168}_0 ∨  p_336 ∨ break
c  in DIMACS:
-5150 -5151  5152  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 168}_2 ∧ -b^{2, 168}_1 ∧ -b^{2, 168}_0 ∧ true) 
c  in CNF:
c    -b^{2, 168}_2 ∨  b^{2, 168}_1 ∨  b^{2, 168}_0 ∨ false 
c  in DIMACS:
-5150  5151  5152  0

c  3 does not represent an automaton state.
c    -(-b^{2, 168}_2 ∧  b^{2, 168}_1 ∧  b^{2, 168}_0 ∧ true) 
c  in CNF:
c     b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ false 
c  in DIMACS:
 5150 -5151 -5152  0
c  -3 does not represent an automaton state.
c    -( b^{2, 168}_2 ∧  b^{2, 168}_1 ∧  b^{2, 168}_0 ∧ true) 
c  in CNF:
c    -b^{2, 168}_2 ∨ -b^{2, 168}_1 ∨ -b^{2, 168}_0 ∨ false 
c  in DIMACS:
-5150 -5151 -5152  0

c i = 169
c  -2+1 --> -1
c    ( b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧  p_338) -> ( b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0)
c  in CNF:
c    -b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨  b^{2, 170}_2
c    -b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_1
c    -b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨  b^{2, 170}_0
c  in DIMACS:
-5153 -5154  5155 -338  5156 0
-5153 -5154  5155 -338 -5157 0
-5153 -5154  5155 -338  5158 0

c  -1+1 --> 0
c    ( b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0 ∧  p_338) -> (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧ -b^{2, 170}_0)
c  in CNF:
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_2
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_1
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_0
c  in DIMACS:
-5153  5154 -5155 -338 -5156 0
-5153  5154 -5155 -338 -5157 0
-5153  5154 -5155 -338 -5158 0

c  0+1 --> 1
c    (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧  p_338) -> (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0)
c  in CNF:
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_2
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_1
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨  b^{2, 170}_0
c  in DIMACS:
 5153  5154  5155 -338 -5156 0
 5153  5154  5155 -338 -5157 0
 5153  5154  5155 -338  5158 0

c  1+1 --> 2
c    (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0 ∧  p_338) -> (-b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0)
c  in CNF:
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_2
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨  b^{2, 170}_1
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ -p_338 ∨ -b^{2, 170}_0
c  in DIMACS:
 5153  5154 -5155 -338 -5156 0
 5153  5154 -5155 -338  5157 0
 5153  5154 -5155 -338 -5158 0

c  2+1 --> break 
c    (-b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧  p_338) -> break
c  in CNF:
c     b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 5153 -5154  5155 -338 1162 0


c  2-1 --> 1
c    (-b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧ -p_338) -> (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0)
c  in CNF:
c     b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_2
c     b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_1
c     b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨  b^{2, 170}_0
c  in DIMACS:
 5153 -5154  5155  338 -5156 0
 5153 -5154  5155  338 -5157 0
 5153 -5154  5155  338  5158 0

c  1-1 --> 0
c    (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0 ∧ -p_338) -> (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧ -b^{2, 170}_0)
c  in CNF:
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_2
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_1
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_0
c  in DIMACS:
 5153  5154 -5155  338 -5156 0
 5153  5154 -5155  338 -5157 0
 5153  5154 -5155  338 -5158 0

c  0-1 --> -1
c    (-b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧ -p_338) -> ( b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0)
c  in CNF:
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨  b^{2, 170}_2
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_1
c     b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨  b^{2, 170}_0
c  in DIMACS:
 5153  5154  5155  338  5156 0
 5153  5154  5155  338 -5157 0
 5153  5154  5155  338  5158 0

c  -1-1 --> -2
c    ( b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧  b^{2, 169}_0 ∧ -p_338) -> ( b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0)
c  in CNF:
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨  b^{2, 170}_2
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨  b^{2, 170}_1
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨  p_338 ∨ -b^{2, 170}_0
c  in DIMACS:
-5153  5154 -5155  338  5156 0
-5153  5154 -5155  338  5157 0
-5153  5154 -5155  338 -5158 0

c  -2-1 --> break 
c    ( b^{2, 169}_2 ∧  b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨  b^{2, 169}_0 ∨  p_338 ∨ break
c  in DIMACS:
-5153 -5154  5155  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 169}_2 ∧ -b^{2, 169}_1 ∧ -b^{2, 169}_0 ∧ true) 
c  in CNF:
c    -b^{2, 169}_2 ∨  b^{2, 169}_1 ∨  b^{2, 169}_0 ∨ false 
c  in DIMACS:
-5153  5154  5155  0

c  3 does not represent an automaton state.
c    -(-b^{2, 169}_2 ∧  b^{2, 169}_1 ∧  b^{2, 169}_0 ∧ true) 
c  in CNF:
c     b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ false 
c  in DIMACS:
 5153 -5154 -5155  0
c  -3 does not represent an automaton state.
c    -( b^{2, 169}_2 ∧  b^{2, 169}_1 ∧  b^{2, 169}_0 ∧ true) 
c  in CNF:
c    -b^{2, 169}_2 ∨ -b^{2, 169}_1 ∨ -b^{2, 169}_0 ∨ false 
c  in DIMACS:
-5153 -5154 -5155  0

c i = 170
c  -2+1 --> -1
c    ( b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧  p_340) -> ( b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0)
c  in CNF:
c    -b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨  b^{2, 171}_2
c    -b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_1
c    -b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨  b^{2, 171}_0
c  in DIMACS:
-5156 -5157  5158 -340  5159 0
-5156 -5157  5158 -340 -5160 0
-5156 -5157  5158 -340  5161 0

c  -1+1 --> 0
c    ( b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0 ∧  p_340) -> (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧ -b^{2, 171}_0)
c  in CNF:
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_2
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_1
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_0
c  in DIMACS:
-5156  5157 -5158 -340 -5159 0
-5156  5157 -5158 -340 -5160 0
-5156  5157 -5158 -340 -5161 0

c  0+1 --> 1
c    (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧  p_340) -> (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0)
c  in CNF:
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_2
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_1
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨  b^{2, 171}_0
c  in DIMACS:
 5156  5157  5158 -340 -5159 0
 5156  5157  5158 -340 -5160 0
 5156  5157  5158 -340  5161 0

c  1+1 --> 2
c    (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0 ∧  p_340) -> (-b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0)
c  in CNF:
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_2
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨  b^{2, 171}_1
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ -p_340 ∨ -b^{2, 171}_0
c  in DIMACS:
 5156  5157 -5158 -340 -5159 0
 5156  5157 -5158 -340  5160 0
 5156  5157 -5158 -340 -5161 0

c  2+1 --> break 
c    (-b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧  p_340) -> break
c  in CNF:
c     b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 5156 -5157  5158 -340 1162 0


c  2-1 --> 1
c    (-b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧ -p_340) -> (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0)
c  in CNF:
c     b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_2
c     b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_1
c     b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨  b^{2, 171}_0
c  in DIMACS:
 5156 -5157  5158  340 -5159 0
 5156 -5157  5158  340 -5160 0
 5156 -5157  5158  340  5161 0

c  1-1 --> 0
c    (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0 ∧ -p_340) -> (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧ -b^{2, 171}_0)
c  in CNF:
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_2
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_1
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_0
c  in DIMACS:
 5156  5157 -5158  340 -5159 0
 5156  5157 -5158  340 -5160 0
 5156  5157 -5158  340 -5161 0

c  0-1 --> -1
c    (-b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧ -p_340) -> ( b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0)
c  in CNF:
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨  b^{2, 171}_2
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_1
c     b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨  b^{2, 171}_0
c  in DIMACS:
 5156  5157  5158  340  5159 0
 5156  5157  5158  340 -5160 0
 5156  5157  5158  340  5161 0

c  -1-1 --> -2
c    ( b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧  b^{2, 170}_0 ∧ -p_340) -> ( b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0)
c  in CNF:
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨  b^{2, 171}_2
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨  b^{2, 171}_1
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨  p_340 ∨ -b^{2, 171}_0
c  in DIMACS:
-5156  5157 -5158  340  5159 0
-5156  5157 -5158  340  5160 0
-5156  5157 -5158  340 -5161 0

c  -2-1 --> break 
c    ( b^{2, 170}_2 ∧  b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨  b^{2, 170}_0 ∨  p_340 ∨ break
c  in DIMACS:
-5156 -5157  5158  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 170}_2 ∧ -b^{2, 170}_1 ∧ -b^{2, 170}_0 ∧ true) 
c  in CNF:
c    -b^{2, 170}_2 ∨  b^{2, 170}_1 ∨  b^{2, 170}_0 ∨ false 
c  in DIMACS:
-5156  5157  5158  0

c  3 does not represent an automaton state.
c    -(-b^{2, 170}_2 ∧  b^{2, 170}_1 ∧  b^{2, 170}_0 ∧ true) 
c  in CNF:
c     b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ false 
c  in DIMACS:
 5156 -5157 -5158  0
c  -3 does not represent an automaton state.
c    -( b^{2, 170}_2 ∧  b^{2, 170}_1 ∧  b^{2, 170}_0 ∧ true) 
c  in CNF:
c    -b^{2, 170}_2 ∨ -b^{2, 170}_1 ∨ -b^{2, 170}_0 ∨ false 
c  in DIMACS:
-5156 -5157 -5158  0

c i = 171
c  -2+1 --> -1
c    ( b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧  p_342) -> ( b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0)
c  in CNF:
c    -b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨  b^{2, 172}_2
c    -b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_1
c    -b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨  b^{2, 172}_0
c  in DIMACS:
-5159 -5160  5161 -342  5162 0
-5159 -5160  5161 -342 -5163 0
-5159 -5160  5161 -342  5164 0

c  -1+1 --> 0
c    ( b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0 ∧  p_342) -> (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧ -b^{2, 172}_0)
c  in CNF:
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_2
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_1
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_0
c  in DIMACS:
-5159  5160 -5161 -342 -5162 0
-5159  5160 -5161 -342 -5163 0
-5159  5160 -5161 -342 -5164 0

c  0+1 --> 1
c    (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧  p_342) -> (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0)
c  in CNF:
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_2
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_1
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨  b^{2, 172}_0
c  in DIMACS:
 5159  5160  5161 -342 -5162 0
 5159  5160  5161 -342 -5163 0
 5159  5160  5161 -342  5164 0

c  1+1 --> 2
c    (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0 ∧  p_342) -> (-b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0)
c  in CNF:
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_2
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨  b^{2, 172}_1
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ -p_342 ∨ -b^{2, 172}_0
c  in DIMACS:
 5159  5160 -5161 -342 -5162 0
 5159  5160 -5161 -342  5163 0
 5159  5160 -5161 -342 -5164 0

c  2+1 --> break 
c    (-b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧  p_342) -> break
c  in CNF:
c     b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 5159 -5160  5161 -342 1162 0


c  2-1 --> 1
c    (-b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧ -p_342) -> (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0)
c  in CNF:
c     b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_2
c     b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_1
c     b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨  b^{2, 172}_0
c  in DIMACS:
 5159 -5160  5161  342 -5162 0
 5159 -5160  5161  342 -5163 0
 5159 -5160  5161  342  5164 0

c  1-1 --> 0
c    (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0 ∧ -p_342) -> (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧ -b^{2, 172}_0)
c  in CNF:
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_2
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_1
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_0
c  in DIMACS:
 5159  5160 -5161  342 -5162 0
 5159  5160 -5161  342 -5163 0
 5159  5160 -5161  342 -5164 0

c  0-1 --> -1
c    (-b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧ -p_342) -> ( b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0)
c  in CNF:
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨  b^{2, 172}_2
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_1
c     b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨  b^{2, 172}_0
c  in DIMACS:
 5159  5160  5161  342  5162 0
 5159  5160  5161  342 -5163 0
 5159  5160  5161  342  5164 0

c  -1-1 --> -2
c    ( b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧  b^{2, 171}_0 ∧ -p_342) -> ( b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0)
c  in CNF:
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨  b^{2, 172}_2
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨  b^{2, 172}_1
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨  p_342 ∨ -b^{2, 172}_0
c  in DIMACS:
-5159  5160 -5161  342  5162 0
-5159  5160 -5161  342  5163 0
-5159  5160 -5161  342 -5164 0

c  -2-1 --> break 
c    ( b^{2, 171}_2 ∧  b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨  b^{2, 171}_0 ∨  p_342 ∨ break
c  in DIMACS:
-5159 -5160  5161  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 171}_2 ∧ -b^{2, 171}_1 ∧ -b^{2, 171}_0 ∧ true) 
c  in CNF:
c    -b^{2, 171}_2 ∨  b^{2, 171}_1 ∨  b^{2, 171}_0 ∨ false 
c  in DIMACS:
-5159  5160  5161  0

c  3 does not represent an automaton state.
c    -(-b^{2, 171}_2 ∧  b^{2, 171}_1 ∧  b^{2, 171}_0 ∧ true) 
c  in CNF:
c     b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ false 
c  in DIMACS:
 5159 -5160 -5161  0
c  -3 does not represent an automaton state.
c    -( b^{2, 171}_2 ∧  b^{2, 171}_1 ∧  b^{2, 171}_0 ∧ true) 
c  in CNF:
c    -b^{2, 171}_2 ∨ -b^{2, 171}_1 ∨ -b^{2, 171}_0 ∨ false 
c  in DIMACS:
-5159 -5160 -5161  0

c i = 172
c  -2+1 --> -1
c    ( b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧  p_344) -> ( b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0)
c  in CNF:
c    -b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨  b^{2, 173}_2
c    -b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_1
c    -b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨  b^{2, 173}_0
c  in DIMACS:
-5162 -5163  5164 -344  5165 0
-5162 -5163  5164 -344 -5166 0
-5162 -5163  5164 -344  5167 0

c  -1+1 --> 0
c    ( b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0 ∧  p_344) -> (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧ -b^{2, 173}_0)
c  in CNF:
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_2
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_1
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_0
c  in DIMACS:
-5162  5163 -5164 -344 -5165 0
-5162  5163 -5164 -344 -5166 0
-5162  5163 -5164 -344 -5167 0

c  0+1 --> 1
c    (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧  p_344) -> (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0)
c  in CNF:
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_2
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_1
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨  b^{2, 173}_0
c  in DIMACS:
 5162  5163  5164 -344 -5165 0
 5162  5163  5164 -344 -5166 0
 5162  5163  5164 -344  5167 0

c  1+1 --> 2
c    (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0 ∧  p_344) -> (-b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0)
c  in CNF:
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_2
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨  b^{2, 173}_1
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ -p_344 ∨ -b^{2, 173}_0
c  in DIMACS:
 5162  5163 -5164 -344 -5165 0
 5162  5163 -5164 -344  5166 0
 5162  5163 -5164 -344 -5167 0

c  2+1 --> break 
c    (-b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧  p_344) -> break
c  in CNF:
c     b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 5162 -5163  5164 -344 1162 0


c  2-1 --> 1
c    (-b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧ -p_344) -> (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0)
c  in CNF:
c     b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_2
c     b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_1
c     b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨  b^{2, 173}_0
c  in DIMACS:
 5162 -5163  5164  344 -5165 0
 5162 -5163  5164  344 -5166 0
 5162 -5163  5164  344  5167 0

c  1-1 --> 0
c    (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0 ∧ -p_344) -> (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧ -b^{2, 173}_0)
c  in CNF:
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_2
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_1
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_0
c  in DIMACS:
 5162  5163 -5164  344 -5165 0
 5162  5163 -5164  344 -5166 0
 5162  5163 -5164  344 -5167 0

c  0-1 --> -1
c    (-b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧ -p_344) -> ( b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0)
c  in CNF:
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨  b^{2, 173}_2
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_1
c     b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨  b^{2, 173}_0
c  in DIMACS:
 5162  5163  5164  344  5165 0
 5162  5163  5164  344 -5166 0
 5162  5163  5164  344  5167 0

c  -1-1 --> -2
c    ( b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧  b^{2, 172}_0 ∧ -p_344) -> ( b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0)
c  in CNF:
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨  b^{2, 173}_2
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨  b^{2, 173}_1
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨  p_344 ∨ -b^{2, 173}_0
c  in DIMACS:
-5162  5163 -5164  344  5165 0
-5162  5163 -5164  344  5166 0
-5162  5163 -5164  344 -5167 0

c  -2-1 --> break 
c    ( b^{2, 172}_2 ∧  b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨  b^{2, 172}_0 ∨  p_344 ∨ break
c  in DIMACS:
-5162 -5163  5164  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 172}_2 ∧ -b^{2, 172}_1 ∧ -b^{2, 172}_0 ∧ true) 
c  in CNF:
c    -b^{2, 172}_2 ∨  b^{2, 172}_1 ∨  b^{2, 172}_0 ∨ false 
c  in DIMACS:
-5162  5163  5164  0

c  3 does not represent an automaton state.
c    -(-b^{2, 172}_2 ∧  b^{2, 172}_1 ∧  b^{2, 172}_0 ∧ true) 
c  in CNF:
c     b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ false 
c  in DIMACS:
 5162 -5163 -5164  0
c  -3 does not represent an automaton state.
c    -( b^{2, 172}_2 ∧  b^{2, 172}_1 ∧  b^{2, 172}_0 ∧ true) 
c  in CNF:
c    -b^{2, 172}_2 ∨ -b^{2, 172}_1 ∨ -b^{2, 172}_0 ∨ false 
c  in DIMACS:
-5162 -5163 -5164  0

c i = 173
c  -2+1 --> -1
c    ( b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧  p_346) -> ( b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0)
c  in CNF:
c    -b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨  b^{2, 174}_2
c    -b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_1
c    -b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨  b^{2, 174}_0
c  in DIMACS:
-5165 -5166  5167 -346  5168 0
-5165 -5166  5167 -346 -5169 0
-5165 -5166  5167 -346  5170 0

c  -1+1 --> 0
c    ( b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0 ∧  p_346) -> (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧ -b^{2, 174}_0)
c  in CNF:
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_2
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_1
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_0
c  in DIMACS:
-5165  5166 -5167 -346 -5168 0
-5165  5166 -5167 -346 -5169 0
-5165  5166 -5167 -346 -5170 0

c  0+1 --> 1
c    (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧  p_346) -> (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0)
c  in CNF:
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_2
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_1
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨  b^{2, 174}_0
c  in DIMACS:
 5165  5166  5167 -346 -5168 0
 5165  5166  5167 -346 -5169 0
 5165  5166  5167 -346  5170 0

c  1+1 --> 2
c    (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0 ∧  p_346) -> (-b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0)
c  in CNF:
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_2
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨  b^{2, 174}_1
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ -p_346 ∨ -b^{2, 174}_0
c  in DIMACS:
 5165  5166 -5167 -346 -5168 0
 5165  5166 -5167 -346  5169 0
 5165  5166 -5167 -346 -5170 0

c  2+1 --> break 
c    (-b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧  p_346) -> break
c  in CNF:
c     b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ -p_346 ∨ break
c  in DIMACS:
 5165 -5166  5167 -346 1162 0


c  2-1 --> 1
c    (-b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧ -p_346) -> (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0)
c  in CNF:
c     b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_2
c     b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_1
c     b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨  b^{2, 174}_0
c  in DIMACS:
 5165 -5166  5167  346 -5168 0
 5165 -5166  5167  346 -5169 0
 5165 -5166  5167  346  5170 0

c  1-1 --> 0
c    (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0 ∧ -p_346) -> (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧ -b^{2, 174}_0)
c  in CNF:
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_2
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_1
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_0
c  in DIMACS:
 5165  5166 -5167  346 -5168 0
 5165  5166 -5167  346 -5169 0
 5165  5166 -5167  346 -5170 0

c  0-1 --> -1
c    (-b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧ -p_346) -> ( b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0)
c  in CNF:
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨  b^{2, 174}_2
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_1
c     b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨  b^{2, 174}_0
c  in DIMACS:
 5165  5166  5167  346  5168 0
 5165  5166  5167  346 -5169 0
 5165  5166  5167  346  5170 0

c  -1-1 --> -2
c    ( b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧  b^{2, 173}_0 ∧ -p_346) -> ( b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0)
c  in CNF:
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨  b^{2, 174}_2
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨  b^{2, 174}_1
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨  p_346 ∨ -b^{2, 174}_0
c  in DIMACS:
-5165  5166 -5167  346  5168 0
-5165  5166 -5167  346  5169 0
-5165  5166 -5167  346 -5170 0

c  -2-1 --> break 
c    ( b^{2, 173}_2 ∧  b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧ -p_346) -> break
c  in CNF:
c    -b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨  b^{2, 173}_0 ∨  p_346 ∨ break
c  in DIMACS:
-5165 -5166  5167  346 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 173}_2 ∧ -b^{2, 173}_1 ∧ -b^{2, 173}_0 ∧ true) 
c  in CNF:
c    -b^{2, 173}_2 ∨  b^{2, 173}_1 ∨  b^{2, 173}_0 ∨ false 
c  in DIMACS:
-5165  5166  5167  0

c  3 does not represent an automaton state.
c    -(-b^{2, 173}_2 ∧  b^{2, 173}_1 ∧  b^{2, 173}_0 ∧ true) 
c  in CNF:
c     b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ false 
c  in DIMACS:
 5165 -5166 -5167  0
c  -3 does not represent an automaton state.
c    -( b^{2, 173}_2 ∧  b^{2, 173}_1 ∧  b^{2, 173}_0 ∧ true) 
c  in CNF:
c    -b^{2, 173}_2 ∨ -b^{2, 173}_1 ∨ -b^{2, 173}_0 ∨ false 
c  in DIMACS:
-5165 -5166 -5167  0

c i = 174
c  -2+1 --> -1
c    ( b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧  p_348) -> ( b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0)
c  in CNF:
c    -b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨  b^{2, 175}_2
c    -b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_1
c    -b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨  b^{2, 175}_0
c  in DIMACS:
-5168 -5169  5170 -348  5171 0
-5168 -5169  5170 -348 -5172 0
-5168 -5169  5170 -348  5173 0

c  -1+1 --> 0
c    ( b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0 ∧  p_348) -> (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧ -b^{2, 175}_0)
c  in CNF:
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_2
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_1
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_0
c  in DIMACS:
-5168  5169 -5170 -348 -5171 0
-5168  5169 -5170 -348 -5172 0
-5168  5169 -5170 -348 -5173 0

c  0+1 --> 1
c    (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧  p_348) -> (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0)
c  in CNF:
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_2
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_1
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨  b^{2, 175}_0
c  in DIMACS:
 5168  5169  5170 -348 -5171 0
 5168  5169  5170 -348 -5172 0
 5168  5169  5170 -348  5173 0

c  1+1 --> 2
c    (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0 ∧  p_348) -> (-b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0)
c  in CNF:
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_2
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨  b^{2, 175}_1
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ -p_348 ∨ -b^{2, 175}_0
c  in DIMACS:
 5168  5169 -5170 -348 -5171 0
 5168  5169 -5170 -348  5172 0
 5168  5169 -5170 -348 -5173 0

c  2+1 --> break 
c    (-b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧  p_348) -> break
c  in CNF:
c     b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 5168 -5169  5170 -348 1162 0


c  2-1 --> 1
c    (-b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧ -p_348) -> (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0)
c  in CNF:
c     b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_2
c     b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_1
c     b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨  b^{2, 175}_0
c  in DIMACS:
 5168 -5169  5170  348 -5171 0
 5168 -5169  5170  348 -5172 0
 5168 -5169  5170  348  5173 0

c  1-1 --> 0
c    (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0 ∧ -p_348) -> (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧ -b^{2, 175}_0)
c  in CNF:
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_2
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_1
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_0
c  in DIMACS:
 5168  5169 -5170  348 -5171 0
 5168  5169 -5170  348 -5172 0
 5168  5169 -5170  348 -5173 0

c  0-1 --> -1
c    (-b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧ -p_348) -> ( b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0)
c  in CNF:
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨  b^{2, 175}_2
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_1
c     b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨  b^{2, 175}_0
c  in DIMACS:
 5168  5169  5170  348  5171 0
 5168  5169  5170  348 -5172 0
 5168  5169  5170  348  5173 0

c  -1-1 --> -2
c    ( b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧  b^{2, 174}_0 ∧ -p_348) -> ( b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0)
c  in CNF:
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨  b^{2, 175}_2
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨  b^{2, 175}_1
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨  p_348 ∨ -b^{2, 175}_0
c  in DIMACS:
-5168  5169 -5170  348  5171 0
-5168  5169 -5170  348  5172 0
-5168  5169 -5170  348 -5173 0

c  -2-1 --> break 
c    ( b^{2, 174}_2 ∧  b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨  b^{2, 174}_0 ∨  p_348 ∨ break
c  in DIMACS:
-5168 -5169  5170  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 174}_2 ∧ -b^{2, 174}_1 ∧ -b^{2, 174}_0 ∧ true) 
c  in CNF:
c    -b^{2, 174}_2 ∨  b^{2, 174}_1 ∨  b^{2, 174}_0 ∨ false 
c  in DIMACS:
-5168  5169  5170  0

c  3 does not represent an automaton state.
c    -(-b^{2, 174}_2 ∧  b^{2, 174}_1 ∧  b^{2, 174}_0 ∧ true) 
c  in CNF:
c     b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ false 
c  in DIMACS:
 5168 -5169 -5170  0
c  -3 does not represent an automaton state.
c    -( b^{2, 174}_2 ∧  b^{2, 174}_1 ∧  b^{2, 174}_0 ∧ true) 
c  in CNF:
c    -b^{2, 174}_2 ∨ -b^{2, 174}_1 ∨ -b^{2, 174}_0 ∨ false 
c  in DIMACS:
-5168 -5169 -5170  0

c i = 175
c  -2+1 --> -1
c    ( b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧  p_350) -> ( b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0)
c  in CNF:
c    -b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨  b^{2, 176}_2
c    -b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_1
c    -b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨  b^{2, 176}_0
c  in DIMACS:
-5171 -5172  5173 -350  5174 0
-5171 -5172  5173 -350 -5175 0
-5171 -5172  5173 -350  5176 0

c  -1+1 --> 0
c    ( b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0 ∧  p_350) -> (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧ -b^{2, 176}_0)
c  in CNF:
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_2
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_1
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_0
c  in DIMACS:
-5171  5172 -5173 -350 -5174 0
-5171  5172 -5173 -350 -5175 0
-5171  5172 -5173 -350 -5176 0

c  0+1 --> 1
c    (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧  p_350) -> (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0)
c  in CNF:
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_2
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_1
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨  b^{2, 176}_0
c  in DIMACS:
 5171  5172  5173 -350 -5174 0
 5171  5172  5173 -350 -5175 0
 5171  5172  5173 -350  5176 0

c  1+1 --> 2
c    (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0 ∧  p_350) -> (-b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0)
c  in CNF:
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_2
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨  b^{2, 176}_1
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ -p_350 ∨ -b^{2, 176}_0
c  in DIMACS:
 5171  5172 -5173 -350 -5174 0
 5171  5172 -5173 -350  5175 0
 5171  5172 -5173 -350 -5176 0

c  2+1 --> break 
c    (-b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧  p_350) -> break
c  in CNF:
c     b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 5171 -5172  5173 -350 1162 0


c  2-1 --> 1
c    (-b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧ -p_350) -> (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0)
c  in CNF:
c     b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_2
c     b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_1
c     b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨  b^{2, 176}_0
c  in DIMACS:
 5171 -5172  5173  350 -5174 0
 5171 -5172  5173  350 -5175 0
 5171 -5172  5173  350  5176 0

c  1-1 --> 0
c    (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0 ∧ -p_350) -> (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧ -b^{2, 176}_0)
c  in CNF:
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_2
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_1
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_0
c  in DIMACS:
 5171  5172 -5173  350 -5174 0
 5171  5172 -5173  350 -5175 0
 5171  5172 -5173  350 -5176 0

c  0-1 --> -1
c    (-b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧ -p_350) -> ( b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0)
c  in CNF:
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨  b^{2, 176}_2
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_1
c     b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨  b^{2, 176}_0
c  in DIMACS:
 5171  5172  5173  350  5174 0
 5171  5172  5173  350 -5175 0
 5171  5172  5173  350  5176 0

c  -1-1 --> -2
c    ( b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧  b^{2, 175}_0 ∧ -p_350) -> ( b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0)
c  in CNF:
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨  b^{2, 176}_2
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨  b^{2, 176}_1
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨  p_350 ∨ -b^{2, 176}_0
c  in DIMACS:
-5171  5172 -5173  350  5174 0
-5171  5172 -5173  350  5175 0
-5171  5172 -5173  350 -5176 0

c  -2-1 --> break 
c    ( b^{2, 175}_2 ∧  b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨  b^{2, 175}_0 ∨  p_350 ∨ break
c  in DIMACS:
-5171 -5172  5173  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 175}_2 ∧ -b^{2, 175}_1 ∧ -b^{2, 175}_0 ∧ true) 
c  in CNF:
c    -b^{2, 175}_2 ∨  b^{2, 175}_1 ∨  b^{2, 175}_0 ∨ false 
c  in DIMACS:
-5171  5172  5173  0

c  3 does not represent an automaton state.
c    -(-b^{2, 175}_2 ∧  b^{2, 175}_1 ∧  b^{2, 175}_0 ∧ true) 
c  in CNF:
c     b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ false 
c  in DIMACS:
 5171 -5172 -5173  0
c  -3 does not represent an automaton state.
c    -( b^{2, 175}_2 ∧  b^{2, 175}_1 ∧  b^{2, 175}_0 ∧ true) 
c  in CNF:
c    -b^{2, 175}_2 ∨ -b^{2, 175}_1 ∨ -b^{2, 175}_0 ∨ false 
c  in DIMACS:
-5171 -5172 -5173  0

c i = 176
c  -2+1 --> -1
c    ( b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧  p_352) -> ( b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0)
c  in CNF:
c    -b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨  b^{2, 177}_2
c    -b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_1
c    -b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨  b^{2, 177}_0
c  in DIMACS:
-5174 -5175  5176 -352  5177 0
-5174 -5175  5176 -352 -5178 0
-5174 -5175  5176 -352  5179 0

c  -1+1 --> 0
c    ( b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0 ∧  p_352) -> (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧ -b^{2, 177}_0)
c  in CNF:
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_2
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_1
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_0
c  in DIMACS:
-5174  5175 -5176 -352 -5177 0
-5174  5175 -5176 -352 -5178 0
-5174  5175 -5176 -352 -5179 0

c  0+1 --> 1
c    (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧  p_352) -> (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0)
c  in CNF:
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_2
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_1
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨  b^{2, 177}_0
c  in DIMACS:
 5174  5175  5176 -352 -5177 0
 5174  5175  5176 -352 -5178 0
 5174  5175  5176 -352  5179 0

c  1+1 --> 2
c    (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0 ∧  p_352) -> (-b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0)
c  in CNF:
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_2
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨  b^{2, 177}_1
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ -p_352 ∨ -b^{2, 177}_0
c  in DIMACS:
 5174  5175 -5176 -352 -5177 0
 5174  5175 -5176 -352  5178 0
 5174  5175 -5176 -352 -5179 0

c  2+1 --> break 
c    (-b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧  p_352) -> break
c  in CNF:
c     b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 5174 -5175  5176 -352 1162 0


c  2-1 --> 1
c    (-b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧ -p_352) -> (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0)
c  in CNF:
c     b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_2
c     b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_1
c     b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨  b^{2, 177}_0
c  in DIMACS:
 5174 -5175  5176  352 -5177 0
 5174 -5175  5176  352 -5178 0
 5174 -5175  5176  352  5179 0

c  1-1 --> 0
c    (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0 ∧ -p_352) -> (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧ -b^{2, 177}_0)
c  in CNF:
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_2
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_1
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_0
c  in DIMACS:
 5174  5175 -5176  352 -5177 0
 5174  5175 -5176  352 -5178 0
 5174  5175 -5176  352 -5179 0

c  0-1 --> -1
c    (-b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧ -p_352) -> ( b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0)
c  in CNF:
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨  b^{2, 177}_2
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_1
c     b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨  b^{2, 177}_0
c  in DIMACS:
 5174  5175  5176  352  5177 0
 5174  5175  5176  352 -5178 0
 5174  5175  5176  352  5179 0

c  -1-1 --> -2
c    ( b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧  b^{2, 176}_0 ∧ -p_352) -> ( b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0)
c  in CNF:
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨  b^{2, 177}_2
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨  b^{2, 177}_1
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨  p_352 ∨ -b^{2, 177}_0
c  in DIMACS:
-5174  5175 -5176  352  5177 0
-5174  5175 -5176  352  5178 0
-5174  5175 -5176  352 -5179 0

c  -2-1 --> break 
c    ( b^{2, 176}_2 ∧  b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨  b^{2, 176}_0 ∨  p_352 ∨ break
c  in DIMACS:
-5174 -5175  5176  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 176}_2 ∧ -b^{2, 176}_1 ∧ -b^{2, 176}_0 ∧ true) 
c  in CNF:
c    -b^{2, 176}_2 ∨  b^{2, 176}_1 ∨  b^{2, 176}_0 ∨ false 
c  in DIMACS:
-5174  5175  5176  0

c  3 does not represent an automaton state.
c    -(-b^{2, 176}_2 ∧  b^{2, 176}_1 ∧  b^{2, 176}_0 ∧ true) 
c  in CNF:
c     b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ false 
c  in DIMACS:
 5174 -5175 -5176  0
c  -3 does not represent an automaton state.
c    -( b^{2, 176}_2 ∧  b^{2, 176}_1 ∧  b^{2, 176}_0 ∧ true) 
c  in CNF:
c    -b^{2, 176}_2 ∨ -b^{2, 176}_1 ∨ -b^{2, 176}_0 ∨ false 
c  in DIMACS:
-5174 -5175 -5176  0

c i = 177
c  -2+1 --> -1
c    ( b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧  p_354) -> ( b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0)
c  in CNF:
c    -b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨  b^{2, 178}_2
c    -b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_1
c    -b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨  b^{2, 178}_0
c  in DIMACS:
-5177 -5178  5179 -354  5180 0
-5177 -5178  5179 -354 -5181 0
-5177 -5178  5179 -354  5182 0

c  -1+1 --> 0
c    ( b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0 ∧  p_354) -> (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧ -b^{2, 178}_0)
c  in CNF:
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_2
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_1
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_0
c  in DIMACS:
-5177  5178 -5179 -354 -5180 0
-5177  5178 -5179 -354 -5181 0
-5177  5178 -5179 -354 -5182 0

c  0+1 --> 1
c    (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧  p_354) -> (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0)
c  in CNF:
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_2
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_1
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨  b^{2, 178}_0
c  in DIMACS:
 5177  5178  5179 -354 -5180 0
 5177  5178  5179 -354 -5181 0
 5177  5178  5179 -354  5182 0

c  1+1 --> 2
c    (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0 ∧  p_354) -> (-b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0)
c  in CNF:
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_2
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨  b^{2, 178}_1
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ -p_354 ∨ -b^{2, 178}_0
c  in DIMACS:
 5177  5178 -5179 -354 -5180 0
 5177  5178 -5179 -354  5181 0
 5177  5178 -5179 -354 -5182 0

c  2+1 --> break 
c    (-b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧  p_354) -> break
c  in CNF:
c     b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 5177 -5178  5179 -354 1162 0


c  2-1 --> 1
c    (-b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧ -p_354) -> (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0)
c  in CNF:
c     b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_2
c     b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_1
c     b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨  b^{2, 178}_0
c  in DIMACS:
 5177 -5178  5179  354 -5180 0
 5177 -5178  5179  354 -5181 0
 5177 -5178  5179  354  5182 0

c  1-1 --> 0
c    (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0 ∧ -p_354) -> (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧ -b^{2, 178}_0)
c  in CNF:
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_2
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_1
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_0
c  in DIMACS:
 5177  5178 -5179  354 -5180 0
 5177  5178 -5179  354 -5181 0
 5177  5178 -5179  354 -5182 0

c  0-1 --> -1
c    (-b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧ -p_354) -> ( b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0)
c  in CNF:
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨  b^{2, 178}_2
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_1
c     b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨  b^{2, 178}_0
c  in DIMACS:
 5177  5178  5179  354  5180 0
 5177  5178  5179  354 -5181 0
 5177  5178  5179  354  5182 0

c  -1-1 --> -2
c    ( b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧  b^{2, 177}_0 ∧ -p_354) -> ( b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0)
c  in CNF:
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨  b^{2, 178}_2
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨  b^{2, 178}_1
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨  p_354 ∨ -b^{2, 178}_0
c  in DIMACS:
-5177  5178 -5179  354  5180 0
-5177  5178 -5179  354  5181 0
-5177  5178 -5179  354 -5182 0

c  -2-1 --> break 
c    ( b^{2, 177}_2 ∧  b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨  b^{2, 177}_0 ∨  p_354 ∨ break
c  in DIMACS:
-5177 -5178  5179  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 177}_2 ∧ -b^{2, 177}_1 ∧ -b^{2, 177}_0 ∧ true) 
c  in CNF:
c    -b^{2, 177}_2 ∨  b^{2, 177}_1 ∨  b^{2, 177}_0 ∨ false 
c  in DIMACS:
-5177  5178  5179  0

c  3 does not represent an automaton state.
c    -(-b^{2, 177}_2 ∧  b^{2, 177}_1 ∧  b^{2, 177}_0 ∧ true) 
c  in CNF:
c     b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ false 
c  in DIMACS:
 5177 -5178 -5179  0
c  -3 does not represent an automaton state.
c    -( b^{2, 177}_2 ∧  b^{2, 177}_1 ∧  b^{2, 177}_0 ∧ true) 
c  in CNF:
c    -b^{2, 177}_2 ∨ -b^{2, 177}_1 ∨ -b^{2, 177}_0 ∨ false 
c  in DIMACS:
-5177 -5178 -5179  0

c i = 178
c  -2+1 --> -1
c    ( b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧  p_356) -> ( b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0)
c  in CNF:
c    -b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨  b^{2, 179}_2
c    -b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_1
c    -b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨  b^{2, 179}_0
c  in DIMACS:
-5180 -5181  5182 -356  5183 0
-5180 -5181  5182 -356 -5184 0
-5180 -5181  5182 -356  5185 0

c  -1+1 --> 0
c    ( b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0 ∧  p_356) -> (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧ -b^{2, 179}_0)
c  in CNF:
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_2
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_1
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_0
c  in DIMACS:
-5180  5181 -5182 -356 -5183 0
-5180  5181 -5182 -356 -5184 0
-5180  5181 -5182 -356 -5185 0

c  0+1 --> 1
c    (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧  p_356) -> (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0)
c  in CNF:
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_2
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_1
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨  b^{2, 179}_0
c  in DIMACS:
 5180  5181  5182 -356 -5183 0
 5180  5181  5182 -356 -5184 0
 5180  5181  5182 -356  5185 0

c  1+1 --> 2
c    (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0 ∧  p_356) -> (-b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0)
c  in CNF:
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_2
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨  b^{2, 179}_1
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ -p_356 ∨ -b^{2, 179}_0
c  in DIMACS:
 5180  5181 -5182 -356 -5183 0
 5180  5181 -5182 -356  5184 0
 5180  5181 -5182 -356 -5185 0

c  2+1 --> break 
c    (-b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧  p_356) -> break
c  in CNF:
c     b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 5180 -5181  5182 -356 1162 0


c  2-1 --> 1
c    (-b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧ -p_356) -> (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0)
c  in CNF:
c     b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_2
c     b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_1
c     b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨  b^{2, 179}_0
c  in DIMACS:
 5180 -5181  5182  356 -5183 0
 5180 -5181  5182  356 -5184 0
 5180 -5181  5182  356  5185 0

c  1-1 --> 0
c    (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0 ∧ -p_356) -> (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧ -b^{2, 179}_0)
c  in CNF:
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_2
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_1
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_0
c  in DIMACS:
 5180  5181 -5182  356 -5183 0
 5180  5181 -5182  356 -5184 0
 5180  5181 -5182  356 -5185 0

c  0-1 --> -1
c    (-b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧ -p_356) -> ( b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0)
c  in CNF:
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨  b^{2, 179}_2
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_1
c     b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨  b^{2, 179}_0
c  in DIMACS:
 5180  5181  5182  356  5183 0
 5180  5181  5182  356 -5184 0
 5180  5181  5182  356  5185 0

c  -1-1 --> -2
c    ( b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧  b^{2, 178}_0 ∧ -p_356) -> ( b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0)
c  in CNF:
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨  b^{2, 179}_2
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨  b^{2, 179}_1
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨  p_356 ∨ -b^{2, 179}_0
c  in DIMACS:
-5180  5181 -5182  356  5183 0
-5180  5181 -5182  356  5184 0
-5180  5181 -5182  356 -5185 0

c  -2-1 --> break 
c    ( b^{2, 178}_2 ∧  b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨  b^{2, 178}_0 ∨  p_356 ∨ break
c  in DIMACS:
-5180 -5181  5182  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 178}_2 ∧ -b^{2, 178}_1 ∧ -b^{2, 178}_0 ∧ true) 
c  in CNF:
c    -b^{2, 178}_2 ∨  b^{2, 178}_1 ∨  b^{2, 178}_0 ∨ false 
c  in DIMACS:
-5180  5181  5182  0

c  3 does not represent an automaton state.
c    -(-b^{2, 178}_2 ∧  b^{2, 178}_1 ∧  b^{2, 178}_0 ∧ true) 
c  in CNF:
c     b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ false 
c  in DIMACS:
 5180 -5181 -5182  0
c  -3 does not represent an automaton state.
c    -( b^{2, 178}_2 ∧  b^{2, 178}_1 ∧  b^{2, 178}_0 ∧ true) 
c  in CNF:
c    -b^{2, 178}_2 ∨ -b^{2, 178}_1 ∨ -b^{2, 178}_0 ∨ false 
c  in DIMACS:
-5180 -5181 -5182  0

c i = 179
c  -2+1 --> -1
c    ( b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧  p_358) -> ( b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0)
c  in CNF:
c    -b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨  b^{2, 180}_2
c    -b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_1
c    -b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨  b^{2, 180}_0
c  in DIMACS:
-5183 -5184  5185 -358  5186 0
-5183 -5184  5185 -358 -5187 0
-5183 -5184  5185 -358  5188 0

c  -1+1 --> 0
c    ( b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0 ∧  p_358) -> (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧ -b^{2, 180}_0)
c  in CNF:
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_2
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_1
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_0
c  in DIMACS:
-5183  5184 -5185 -358 -5186 0
-5183  5184 -5185 -358 -5187 0
-5183  5184 -5185 -358 -5188 0

c  0+1 --> 1
c    (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧  p_358) -> (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0)
c  in CNF:
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_2
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_1
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨  b^{2, 180}_0
c  in DIMACS:
 5183  5184  5185 -358 -5186 0
 5183  5184  5185 -358 -5187 0
 5183  5184  5185 -358  5188 0

c  1+1 --> 2
c    (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0 ∧  p_358) -> (-b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0)
c  in CNF:
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_2
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨  b^{2, 180}_1
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ -p_358 ∨ -b^{2, 180}_0
c  in DIMACS:
 5183  5184 -5185 -358 -5186 0
 5183  5184 -5185 -358  5187 0
 5183  5184 -5185 -358 -5188 0

c  2+1 --> break 
c    (-b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧  p_358) -> break
c  in CNF:
c     b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ -p_358 ∨ break
c  in DIMACS:
 5183 -5184  5185 -358 1162 0


c  2-1 --> 1
c    (-b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧ -p_358) -> (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0)
c  in CNF:
c     b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_2
c     b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_1
c     b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨  b^{2, 180}_0
c  in DIMACS:
 5183 -5184  5185  358 -5186 0
 5183 -5184  5185  358 -5187 0
 5183 -5184  5185  358  5188 0

c  1-1 --> 0
c    (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0 ∧ -p_358) -> (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧ -b^{2, 180}_0)
c  in CNF:
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_2
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_1
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_0
c  in DIMACS:
 5183  5184 -5185  358 -5186 0
 5183  5184 -5185  358 -5187 0
 5183  5184 -5185  358 -5188 0

c  0-1 --> -1
c    (-b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧ -p_358) -> ( b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0)
c  in CNF:
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨  b^{2, 180}_2
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_1
c     b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨  b^{2, 180}_0
c  in DIMACS:
 5183  5184  5185  358  5186 0
 5183  5184  5185  358 -5187 0
 5183  5184  5185  358  5188 0

c  -1-1 --> -2
c    ( b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧  b^{2, 179}_0 ∧ -p_358) -> ( b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0)
c  in CNF:
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨  b^{2, 180}_2
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨  b^{2, 180}_1
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨  p_358 ∨ -b^{2, 180}_0
c  in DIMACS:
-5183  5184 -5185  358  5186 0
-5183  5184 -5185  358  5187 0
-5183  5184 -5185  358 -5188 0

c  -2-1 --> break 
c    ( b^{2, 179}_2 ∧  b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧ -p_358) -> break
c  in CNF:
c    -b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨  b^{2, 179}_0 ∨  p_358 ∨ break
c  in DIMACS:
-5183 -5184  5185  358 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 179}_2 ∧ -b^{2, 179}_1 ∧ -b^{2, 179}_0 ∧ true) 
c  in CNF:
c    -b^{2, 179}_2 ∨  b^{2, 179}_1 ∨  b^{2, 179}_0 ∨ false 
c  in DIMACS:
-5183  5184  5185  0

c  3 does not represent an automaton state.
c    -(-b^{2, 179}_2 ∧  b^{2, 179}_1 ∧  b^{2, 179}_0 ∧ true) 
c  in CNF:
c     b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ false 
c  in DIMACS:
 5183 -5184 -5185  0
c  -3 does not represent an automaton state.
c    -( b^{2, 179}_2 ∧  b^{2, 179}_1 ∧  b^{2, 179}_0 ∧ true) 
c  in CNF:
c    -b^{2, 179}_2 ∨ -b^{2, 179}_1 ∨ -b^{2, 179}_0 ∨ false 
c  in DIMACS:
-5183 -5184 -5185  0

c i = 180
c  -2+1 --> -1
c    ( b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧  p_360) -> ( b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0)
c  in CNF:
c    -b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨  b^{2, 181}_2
c    -b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_1
c    -b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨  b^{2, 181}_0
c  in DIMACS:
-5186 -5187  5188 -360  5189 0
-5186 -5187  5188 -360 -5190 0
-5186 -5187  5188 -360  5191 0

c  -1+1 --> 0
c    ( b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0 ∧  p_360) -> (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧ -b^{2, 181}_0)
c  in CNF:
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_2
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_1
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_0
c  in DIMACS:
-5186  5187 -5188 -360 -5189 0
-5186  5187 -5188 -360 -5190 0
-5186  5187 -5188 -360 -5191 0

c  0+1 --> 1
c    (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧  p_360) -> (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0)
c  in CNF:
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_2
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_1
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨  b^{2, 181}_0
c  in DIMACS:
 5186  5187  5188 -360 -5189 0
 5186  5187  5188 -360 -5190 0
 5186  5187  5188 -360  5191 0

c  1+1 --> 2
c    (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0 ∧  p_360) -> (-b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0)
c  in CNF:
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_2
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨  b^{2, 181}_1
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ -p_360 ∨ -b^{2, 181}_0
c  in DIMACS:
 5186  5187 -5188 -360 -5189 0
 5186  5187 -5188 -360  5190 0
 5186  5187 -5188 -360 -5191 0

c  2+1 --> break 
c    (-b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧  p_360) -> break
c  in CNF:
c     b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 5186 -5187  5188 -360 1162 0


c  2-1 --> 1
c    (-b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧ -p_360) -> (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0)
c  in CNF:
c     b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_2
c     b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_1
c     b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨  b^{2, 181}_0
c  in DIMACS:
 5186 -5187  5188  360 -5189 0
 5186 -5187  5188  360 -5190 0
 5186 -5187  5188  360  5191 0

c  1-1 --> 0
c    (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0 ∧ -p_360) -> (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧ -b^{2, 181}_0)
c  in CNF:
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_2
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_1
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_0
c  in DIMACS:
 5186  5187 -5188  360 -5189 0
 5186  5187 -5188  360 -5190 0
 5186  5187 -5188  360 -5191 0

c  0-1 --> -1
c    (-b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧ -p_360) -> ( b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0)
c  in CNF:
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨  b^{2, 181}_2
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_1
c     b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨  b^{2, 181}_0
c  in DIMACS:
 5186  5187  5188  360  5189 0
 5186  5187  5188  360 -5190 0
 5186  5187  5188  360  5191 0

c  -1-1 --> -2
c    ( b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧  b^{2, 180}_0 ∧ -p_360) -> ( b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0)
c  in CNF:
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨  b^{2, 181}_2
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨  b^{2, 181}_1
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨  p_360 ∨ -b^{2, 181}_0
c  in DIMACS:
-5186  5187 -5188  360  5189 0
-5186  5187 -5188  360  5190 0
-5186  5187 -5188  360 -5191 0

c  -2-1 --> break 
c    ( b^{2, 180}_2 ∧  b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨  b^{2, 180}_0 ∨  p_360 ∨ break
c  in DIMACS:
-5186 -5187  5188  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 180}_2 ∧ -b^{2, 180}_1 ∧ -b^{2, 180}_0 ∧ true) 
c  in CNF:
c    -b^{2, 180}_2 ∨  b^{2, 180}_1 ∨  b^{2, 180}_0 ∨ false 
c  in DIMACS:
-5186  5187  5188  0

c  3 does not represent an automaton state.
c    -(-b^{2, 180}_2 ∧  b^{2, 180}_1 ∧  b^{2, 180}_0 ∧ true) 
c  in CNF:
c     b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ false 
c  in DIMACS:
 5186 -5187 -5188  0
c  -3 does not represent an automaton state.
c    -( b^{2, 180}_2 ∧  b^{2, 180}_1 ∧  b^{2, 180}_0 ∧ true) 
c  in CNF:
c    -b^{2, 180}_2 ∨ -b^{2, 180}_1 ∨ -b^{2, 180}_0 ∨ false 
c  in DIMACS:
-5186 -5187 -5188  0

c i = 181
c  -2+1 --> -1
c    ( b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧  p_362) -> ( b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0)
c  in CNF:
c    -b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨  b^{2, 182}_2
c    -b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_1
c    -b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨  b^{2, 182}_0
c  in DIMACS:
-5189 -5190  5191 -362  5192 0
-5189 -5190  5191 -362 -5193 0
-5189 -5190  5191 -362  5194 0

c  -1+1 --> 0
c    ( b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0 ∧  p_362) -> (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧ -b^{2, 182}_0)
c  in CNF:
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_2
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_1
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_0
c  in DIMACS:
-5189  5190 -5191 -362 -5192 0
-5189  5190 -5191 -362 -5193 0
-5189  5190 -5191 -362 -5194 0

c  0+1 --> 1
c    (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧  p_362) -> (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0)
c  in CNF:
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_2
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_1
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨  b^{2, 182}_0
c  in DIMACS:
 5189  5190  5191 -362 -5192 0
 5189  5190  5191 -362 -5193 0
 5189  5190  5191 -362  5194 0

c  1+1 --> 2
c    (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0 ∧  p_362) -> (-b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0)
c  in CNF:
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_2
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨  b^{2, 182}_1
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ -p_362 ∨ -b^{2, 182}_0
c  in DIMACS:
 5189  5190 -5191 -362 -5192 0
 5189  5190 -5191 -362  5193 0
 5189  5190 -5191 -362 -5194 0

c  2+1 --> break 
c    (-b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧  p_362) -> break
c  in CNF:
c     b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ -p_362 ∨ break
c  in DIMACS:
 5189 -5190  5191 -362 1162 0


c  2-1 --> 1
c    (-b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧ -p_362) -> (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0)
c  in CNF:
c     b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_2
c     b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_1
c     b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨  b^{2, 182}_0
c  in DIMACS:
 5189 -5190  5191  362 -5192 0
 5189 -5190  5191  362 -5193 0
 5189 -5190  5191  362  5194 0

c  1-1 --> 0
c    (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0 ∧ -p_362) -> (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧ -b^{2, 182}_0)
c  in CNF:
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_2
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_1
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_0
c  in DIMACS:
 5189  5190 -5191  362 -5192 0
 5189  5190 -5191  362 -5193 0
 5189  5190 -5191  362 -5194 0

c  0-1 --> -1
c    (-b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧ -p_362) -> ( b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0)
c  in CNF:
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨  b^{2, 182}_2
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_1
c     b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨  b^{2, 182}_0
c  in DIMACS:
 5189  5190  5191  362  5192 0
 5189  5190  5191  362 -5193 0
 5189  5190  5191  362  5194 0

c  -1-1 --> -2
c    ( b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧  b^{2, 181}_0 ∧ -p_362) -> ( b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0)
c  in CNF:
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨  b^{2, 182}_2
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨  b^{2, 182}_1
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨  p_362 ∨ -b^{2, 182}_0
c  in DIMACS:
-5189  5190 -5191  362  5192 0
-5189  5190 -5191  362  5193 0
-5189  5190 -5191  362 -5194 0

c  -2-1 --> break 
c    ( b^{2, 181}_2 ∧  b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧ -p_362) -> break
c  in CNF:
c    -b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨  b^{2, 181}_0 ∨  p_362 ∨ break
c  in DIMACS:
-5189 -5190  5191  362 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 181}_2 ∧ -b^{2, 181}_1 ∧ -b^{2, 181}_0 ∧ true) 
c  in CNF:
c    -b^{2, 181}_2 ∨  b^{2, 181}_1 ∨  b^{2, 181}_0 ∨ false 
c  in DIMACS:
-5189  5190  5191  0

c  3 does not represent an automaton state.
c    -(-b^{2, 181}_2 ∧  b^{2, 181}_1 ∧  b^{2, 181}_0 ∧ true) 
c  in CNF:
c     b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ false 
c  in DIMACS:
 5189 -5190 -5191  0
c  -3 does not represent an automaton state.
c    -( b^{2, 181}_2 ∧  b^{2, 181}_1 ∧  b^{2, 181}_0 ∧ true) 
c  in CNF:
c    -b^{2, 181}_2 ∨ -b^{2, 181}_1 ∨ -b^{2, 181}_0 ∨ false 
c  in DIMACS:
-5189 -5190 -5191  0

c i = 182
c  -2+1 --> -1
c    ( b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧  p_364) -> ( b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0)
c  in CNF:
c    -b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨  b^{2, 183}_2
c    -b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_1
c    -b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨  b^{2, 183}_0
c  in DIMACS:
-5192 -5193  5194 -364  5195 0
-5192 -5193  5194 -364 -5196 0
-5192 -5193  5194 -364  5197 0

c  -1+1 --> 0
c    ( b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0 ∧  p_364) -> (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧ -b^{2, 183}_0)
c  in CNF:
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_2
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_1
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_0
c  in DIMACS:
-5192  5193 -5194 -364 -5195 0
-5192  5193 -5194 -364 -5196 0
-5192  5193 -5194 -364 -5197 0

c  0+1 --> 1
c    (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧  p_364) -> (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0)
c  in CNF:
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_2
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_1
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨  b^{2, 183}_0
c  in DIMACS:
 5192  5193  5194 -364 -5195 0
 5192  5193  5194 -364 -5196 0
 5192  5193  5194 -364  5197 0

c  1+1 --> 2
c    (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0 ∧  p_364) -> (-b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0)
c  in CNF:
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_2
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨  b^{2, 183}_1
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ -p_364 ∨ -b^{2, 183}_0
c  in DIMACS:
 5192  5193 -5194 -364 -5195 0
 5192  5193 -5194 -364  5196 0
 5192  5193 -5194 -364 -5197 0

c  2+1 --> break 
c    (-b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧  p_364) -> break
c  in CNF:
c     b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 5192 -5193  5194 -364 1162 0


c  2-1 --> 1
c    (-b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧ -p_364) -> (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0)
c  in CNF:
c     b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_2
c     b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_1
c     b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨  b^{2, 183}_0
c  in DIMACS:
 5192 -5193  5194  364 -5195 0
 5192 -5193  5194  364 -5196 0
 5192 -5193  5194  364  5197 0

c  1-1 --> 0
c    (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0 ∧ -p_364) -> (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧ -b^{2, 183}_0)
c  in CNF:
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_2
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_1
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_0
c  in DIMACS:
 5192  5193 -5194  364 -5195 0
 5192  5193 -5194  364 -5196 0
 5192  5193 -5194  364 -5197 0

c  0-1 --> -1
c    (-b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧ -p_364) -> ( b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0)
c  in CNF:
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨  b^{2, 183}_2
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_1
c     b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨  b^{2, 183}_0
c  in DIMACS:
 5192  5193  5194  364  5195 0
 5192  5193  5194  364 -5196 0
 5192  5193  5194  364  5197 0

c  -1-1 --> -2
c    ( b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧  b^{2, 182}_0 ∧ -p_364) -> ( b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0)
c  in CNF:
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨  b^{2, 183}_2
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨  b^{2, 183}_1
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨  p_364 ∨ -b^{2, 183}_0
c  in DIMACS:
-5192  5193 -5194  364  5195 0
-5192  5193 -5194  364  5196 0
-5192  5193 -5194  364 -5197 0

c  -2-1 --> break 
c    ( b^{2, 182}_2 ∧  b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨  b^{2, 182}_0 ∨  p_364 ∨ break
c  in DIMACS:
-5192 -5193  5194  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 182}_2 ∧ -b^{2, 182}_1 ∧ -b^{2, 182}_0 ∧ true) 
c  in CNF:
c    -b^{2, 182}_2 ∨  b^{2, 182}_1 ∨  b^{2, 182}_0 ∨ false 
c  in DIMACS:
-5192  5193  5194  0

c  3 does not represent an automaton state.
c    -(-b^{2, 182}_2 ∧  b^{2, 182}_1 ∧  b^{2, 182}_0 ∧ true) 
c  in CNF:
c     b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ false 
c  in DIMACS:
 5192 -5193 -5194  0
c  -3 does not represent an automaton state.
c    -( b^{2, 182}_2 ∧  b^{2, 182}_1 ∧  b^{2, 182}_0 ∧ true) 
c  in CNF:
c    -b^{2, 182}_2 ∨ -b^{2, 182}_1 ∨ -b^{2, 182}_0 ∨ false 
c  in DIMACS:
-5192 -5193 -5194  0

c i = 183
c  -2+1 --> -1
c    ( b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧  p_366) -> ( b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0)
c  in CNF:
c    -b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨  b^{2, 184}_2
c    -b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_1
c    -b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨  b^{2, 184}_0
c  in DIMACS:
-5195 -5196  5197 -366  5198 0
-5195 -5196  5197 -366 -5199 0
-5195 -5196  5197 -366  5200 0

c  -1+1 --> 0
c    ( b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0 ∧  p_366) -> (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧ -b^{2, 184}_0)
c  in CNF:
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_2
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_1
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_0
c  in DIMACS:
-5195  5196 -5197 -366 -5198 0
-5195  5196 -5197 -366 -5199 0
-5195  5196 -5197 -366 -5200 0

c  0+1 --> 1
c    (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧  p_366) -> (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0)
c  in CNF:
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_2
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_1
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨  b^{2, 184}_0
c  in DIMACS:
 5195  5196  5197 -366 -5198 0
 5195  5196  5197 -366 -5199 0
 5195  5196  5197 -366  5200 0

c  1+1 --> 2
c    (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0 ∧  p_366) -> (-b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0)
c  in CNF:
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_2
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨  b^{2, 184}_1
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ -p_366 ∨ -b^{2, 184}_0
c  in DIMACS:
 5195  5196 -5197 -366 -5198 0
 5195  5196 -5197 -366  5199 0
 5195  5196 -5197 -366 -5200 0

c  2+1 --> break 
c    (-b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧  p_366) -> break
c  in CNF:
c     b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 5195 -5196  5197 -366 1162 0


c  2-1 --> 1
c    (-b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧ -p_366) -> (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0)
c  in CNF:
c     b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_2
c     b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_1
c     b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨  b^{2, 184}_0
c  in DIMACS:
 5195 -5196  5197  366 -5198 0
 5195 -5196  5197  366 -5199 0
 5195 -5196  5197  366  5200 0

c  1-1 --> 0
c    (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0 ∧ -p_366) -> (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧ -b^{2, 184}_0)
c  in CNF:
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_2
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_1
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_0
c  in DIMACS:
 5195  5196 -5197  366 -5198 0
 5195  5196 -5197  366 -5199 0
 5195  5196 -5197  366 -5200 0

c  0-1 --> -1
c    (-b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧ -p_366) -> ( b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0)
c  in CNF:
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨  b^{2, 184}_2
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_1
c     b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨  b^{2, 184}_0
c  in DIMACS:
 5195  5196  5197  366  5198 0
 5195  5196  5197  366 -5199 0
 5195  5196  5197  366  5200 0

c  -1-1 --> -2
c    ( b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧  b^{2, 183}_0 ∧ -p_366) -> ( b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0)
c  in CNF:
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨  b^{2, 184}_2
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨  b^{2, 184}_1
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨  p_366 ∨ -b^{2, 184}_0
c  in DIMACS:
-5195  5196 -5197  366  5198 0
-5195  5196 -5197  366  5199 0
-5195  5196 -5197  366 -5200 0

c  -2-1 --> break 
c    ( b^{2, 183}_2 ∧  b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨  b^{2, 183}_0 ∨  p_366 ∨ break
c  in DIMACS:
-5195 -5196  5197  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 183}_2 ∧ -b^{2, 183}_1 ∧ -b^{2, 183}_0 ∧ true) 
c  in CNF:
c    -b^{2, 183}_2 ∨  b^{2, 183}_1 ∨  b^{2, 183}_0 ∨ false 
c  in DIMACS:
-5195  5196  5197  0

c  3 does not represent an automaton state.
c    -(-b^{2, 183}_2 ∧  b^{2, 183}_1 ∧  b^{2, 183}_0 ∧ true) 
c  in CNF:
c     b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ false 
c  in DIMACS:
 5195 -5196 -5197  0
c  -3 does not represent an automaton state.
c    -( b^{2, 183}_2 ∧  b^{2, 183}_1 ∧  b^{2, 183}_0 ∧ true) 
c  in CNF:
c    -b^{2, 183}_2 ∨ -b^{2, 183}_1 ∨ -b^{2, 183}_0 ∨ false 
c  in DIMACS:
-5195 -5196 -5197  0

c i = 184
c  -2+1 --> -1
c    ( b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧  p_368) -> ( b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0)
c  in CNF:
c    -b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨  b^{2, 185}_2
c    -b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_1
c    -b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨  b^{2, 185}_0
c  in DIMACS:
-5198 -5199  5200 -368  5201 0
-5198 -5199  5200 -368 -5202 0
-5198 -5199  5200 -368  5203 0

c  -1+1 --> 0
c    ( b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0 ∧  p_368) -> (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧ -b^{2, 185}_0)
c  in CNF:
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_2
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_1
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_0
c  in DIMACS:
-5198  5199 -5200 -368 -5201 0
-5198  5199 -5200 -368 -5202 0
-5198  5199 -5200 -368 -5203 0

c  0+1 --> 1
c    (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧  p_368) -> (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0)
c  in CNF:
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_2
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_1
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨  b^{2, 185}_0
c  in DIMACS:
 5198  5199  5200 -368 -5201 0
 5198  5199  5200 -368 -5202 0
 5198  5199  5200 -368  5203 0

c  1+1 --> 2
c    (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0 ∧  p_368) -> (-b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0)
c  in CNF:
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_2
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨  b^{2, 185}_1
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ -p_368 ∨ -b^{2, 185}_0
c  in DIMACS:
 5198  5199 -5200 -368 -5201 0
 5198  5199 -5200 -368  5202 0
 5198  5199 -5200 -368 -5203 0

c  2+1 --> break 
c    (-b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧  p_368) -> break
c  in CNF:
c     b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 5198 -5199  5200 -368 1162 0


c  2-1 --> 1
c    (-b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧ -p_368) -> (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0)
c  in CNF:
c     b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_2
c     b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_1
c     b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨  b^{2, 185}_0
c  in DIMACS:
 5198 -5199  5200  368 -5201 0
 5198 -5199  5200  368 -5202 0
 5198 -5199  5200  368  5203 0

c  1-1 --> 0
c    (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0 ∧ -p_368) -> (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧ -b^{2, 185}_0)
c  in CNF:
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_2
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_1
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_0
c  in DIMACS:
 5198  5199 -5200  368 -5201 0
 5198  5199 -5200  368 -5202 0
 5198  5199 -5200  368 -5203 0

c  0-1 --> -1
c    (-b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧ -p_368) -> ( b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0)
c  in CNF:
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨  b^{2, 185}_2
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_1
c     b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨  b^{2, 185}_0
c  in DIMACS:
 5198  5199  5200  368  5201 0
 5198  5199  5200  368 -5202 0
 5198  5199  5200  368  5203 0

c  -1-1 --> -2
c    ( b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧  b^{2, 184}_0 ∧ -p_368) -> ( b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0)
c  in CNF:
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨  b^{2, 185}_2
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨  b^{2, 185}_1
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨  p_368 ∨ -b^{2, 185}_0
c  in DIMACS:
-5198  5199 -5200  368  5201 0
-5198  5199 -5200  368  5202 0
-5198  5199 -5200  368 -5203 0

c  -2-1 --> break 
c    ( b^{2, 184}_2 ∧  b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨  b^{2, 184}_0 ∨  p_368 ∨ break
c  in DIMACS:
-5198 -5199  5200  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 184}_2 ∧ -b^{2, 184}_1 ∧ -b^{2, 184}_0 ∧ true) 
c  in CNF:
c    -b^{2, 184}_2 ∨  b^{2, 184}_1 ∨  b^{2, 184}_0 ∨ false 
c  in DIMACS:
-5198  5199  5200  0

c  3 does not represent an automaton state.
c    -(-b^{2, 184}_2 ∧  b^{2, 184}_1 ∧  b^{2, 184}_0 ∧ true) 
c  in CNF:
c     b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ false 
c  in DIMACS:
 5198 -5199 -5200  0
c  -3 does not represent an automaton state.
c    -( b^{2, 184}_2 ∧  b^{2, 184}_1 ∧  b^{2, 184}_0 ∧ true) 
c  in CNF:
c    -b^{2, 184}_2 ∨ -b^{2, 184}_1 ∨ -b^{2, 184}_0 ∨ false 
c  in DIMACS:
-5198 -5199 -5200  0

c i = 185
c  -2+1 --> -1
c    ( b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧  p_370) -> ( b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0)
c  in CNF:
c    -b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨  b^{2, 186}_2
c    -b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_1
c    -b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨  b^{2, 186}_0
c  in DIMACS:
-5201 -5202  5203 -370  5204 0
-5201 -5202  5203 -370 -5205 0
-5201 -5202  5203 -370  5206 0

c  -1+1 --> 0
c    ( b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0 ∧  p_370) -> (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧ -b^{2, 186}_0)
c  in CNF:
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_2
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_1
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_0
c  in DIMACS:
-5201  5202 -5203 -370 -5204 0
-5201  5202 -5203 -370 -5205 0
-5201  5202 -5203 -370 -5206 0

c  0+1 --> 1
c    (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧  p_370) -> (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0)
c  in CNF:
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_2
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_1
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨  b^{2, 186}_0
c  in DIMACS:
 5201  5202  5203 -370 -5204 0
 5201  5202  5203 -370 -5205 0
 5201  5202  5203 -370  5206 0

c  1+1 --> 2
c    (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0 ∧  p_370) -> (-b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0)
c  in CNF:
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_2
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨  b^{2, 186}_1
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ -p_370 ∨ -b^{2, 186}_0
c  in DIMACS:
 5201  5202 -5203 -370 -5204 0
 5201  5202 -5203 -370  5205 0
 5201  5202 -5203 -370 -5206 0

c  2+1 --> break 
c    (-b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧  p_370) -> break
c  in CNF:
c     b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 5201 -5202  5203 -370 1162 0


c  2-1 --> 1
c    (-b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧ -p_370) -> (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0)
c  in CNF:
c     b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_2
c     b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_1
c     b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨  b^{2, 186}_0
c  in DIMACS:
 5201 -5202  5203  370 -5204 0
 5201 -5202  5203  370 -5205 0
 5201 -5202  5203  370  5206 0

c  1-1 --> 0
c    (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0 ∧ -p_370) -> (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧ -b^{2, 186}_0)
c  in CNF:
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_2
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_1
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_0
c  in DIMACS:
 5201  5202 -5203  370 -5204 0
 5201  5202 -5203  370 -5205 0
 5201  5202 -5203  370 -5206 0

c  0-1 --> -1
c    (-b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧ -p_370) -> ( b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0)
c  in CNF:
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨  b^{2, 186}_2
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_1
c     b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨  b^{2, 186}_0
c  in DIMACS:
 5201  5202  5203  370  5204 0
 5201  5202  5203  370 -5205 0
 5201  5202  5203  370  5206 0

c  -1-1 --> -2
c    ( b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧  b^{2, 185}_0 ∧ -p_370) -> ( b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0)
c  in CNF:
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨  b^{2, 186}_2
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨  b^{2, 186}_1
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨  p_370 ∨ -b^{2, 186}_0
c  in DIMACS:
-5201  5202 -5203  370  5204 0
-5201  5202 -5203  370  5205 0
-5201  5202 -5203  370 -5206 0

c  -2-1 --> break 
c    ( b^{2, 185}_2 ∧  b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨  b^{2, 185}_0 ∨  p_370 ∨ break
c  in DIMACS:
-5201 -5202  5203  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 185}_2 ∧ -b^{2, 185}_1 ∧ -b^{2, 185}_0 ∧ true) 
c  in CNF:
c    -b^{2, 185}_2 ∨  b^{2, 185}_1 ∨  b^{2, 185}_0 ∨ false 
c  in DIMACS:
-5201  5202  5203  0

c  3 does not represent an automaton state.
c    -(-b^{2, 185}_2 ∧  b^{2, 185}_1 ∧  b^{2, 185}_0 ∧ true) 
c  in CNF:
c     b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ false 
c  in DIMACS:
 5201 -5202 -5203  0
c  -3 does not represent an automaton state.
c    -( b^{2, 185}_2 ∧  b^{2, 185}_1 ∧  b^{2, 185}_0 ∧ true) 
c  in CNF:
c    -b^{2, 185}_2 ∨ -b^{2, 185}_1 ∨ -b^{2, 185}_0 ∨ false 
c  in DIMACS:
-5201 -5202 -5203  0

c i = 186
c  -2+1 --> -1
c    ( b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧  p_372) -> ( b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0)
c  in CNF:
c    -b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨  b^{2, 187}_2
c    -b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_1
c    -b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨  b^{2, 187}_0
c  in DIMACS:
-5204 -5205  5206 -372  5207 0
-5204 -5205  5206 -372 -5208 0
-5204 -5205  5206 -372  5209 0

c  -1+1 --> 0
c    ( b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0 ∧  p_372) -> (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧ -b^{2, 187}_0)
c  in CNF:
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_2
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_1
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_0
c  in DIMACS:
-5204  5205 -5206 -372 -5207 0
-5204  5205 -5206 -372 -5208 0
-5204  5205 -5206 -372 -5209 0

c  0+1 --> 1
c    (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧  p_372) -> (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0)
c  in CNF:
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_2
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_1
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨  b^{2, 187}_0
c  in DIMACS:
 5204  5205  5206 -372 -5207 0
 5204  5205  5206 -372 -5208 0
 5204  5205  5206 -372  5209 0

c  1+1 --> 2
c    (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0 ∧  p_372) -> (-b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0)
c  in CNF:
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_2
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨  b^{2, 187}_1
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ -p_372 ∨ -b^{2, 187}_0
c  in DIMACS:
 5204  5205 -5206 -372 -5207 0
 5204  5205 -5206 -372  5208 0
 5204  5205 -5206 -372 -5209 0

c  2+1 --> break 
c    (-b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧  p_372) -> break
c  in CNF:
c     b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 5204 -5205  5206 -372 1162 0


c  2-1 --> 1
c    (-b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧ -p_372) -> (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0)
c  in CNF:
c     b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_2
c     b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_1
c     b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨  b^{2, 187}_0
c  in DIMACS:
 5204 -5205  5206  372 -5207 0
 5204 -5205  5206  372 -5208 0
 5204 -5205  5206  372  5209 0

c  1-1 --> 0
c    (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0 ∧ -p_372) -> (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧ -b^{2, 187}_0)
c  in CNF:
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_2
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_1
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_0
c  in DIMACS:
 5204  5205 -5206  372 -5207 0
 5204  5205 -5206  372 -5208 0
 5204  5205 -5206  372 -5209 0

c  0-1 --> -1
c    (-b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧ -p_372) -> ( b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0)
c  in CNF:
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨  b^{2, 187}_2
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_1
c     b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨  b^{2, 187}_0
c  in DIMACS:
 5204  5205  5206  372  5207 0
 5204  5205  5206  372 -5208 0
 5204  5205  5206  372  5209 0

c  -1-1 --> -2
c    ( b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧  b^{2, 186}_0 ∧ -p_372) -> ( b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0)
c  in CNF:
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨  b^{2, 187}_2
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨  b^{2, 187}_1
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨  p_372 ∨ -b^{2, 187}_0
c  in DIMACS:
-5204  5205 -5206  372  5207 0
-5204  5205 -5206  372  5208 0
-5204  5205 -5206  372 -5209 0

c  -2-1 --> break 
c    ( b^{2, 186}_2 ∧  b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨  b^{2, 186}_0 ∨  p_372 ∨ break
c  in DIMACS:
-5204 -5205  5206  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 186}_2 ∧ -b^{2, 186}_1 ∧ -b^{2, 186}_0 ∧ true) 
c  in CNF:
c    -b^{2, 186}_2 ∨  b^{2, 186}_1 ∨  b^{2, 186}_0 ∨ false 
c  in DIMACS:
-5204  5205  5206  0

c  3 does not represent an automaton state.
c    -(-b^{2, 186}_2 ∧  b^{2, 186}_1 ∧  b^{2, 186}_0 ∧ true) 
c  in CNF:
c     b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ false 
c  in DIMACS:
 5204 -5205 -5206  0
c  -3 does not represent an automaton state.
c    -( b^{2, 186}_2 ∧  b^{2, 186}_1 ∧  b^{2, 186}_0 ∧ true) 
c  in CNF:
c    -b^{2, 186}_2 ∨ -b^{2, 186}_1 ∨ -b^{2, 186}_0 ∨ false 
c  in DIMACS:
-5204 -5205 -5206  0

c i = 187
c  -2+1 --> -1
c    ( b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧  p_374) -> ( b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0)
c  in CNF:
c    -b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨  b^{2, 188}_2
c    -b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_1
c    -b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨  b^{2, 188}_0
c  in DIMACS:
-5207 -5208  5209 -374  5210 0
-5207 -5208  5209 -374 -5211 0
-5207 -5208  5209 -374  5212 0

c  -1+1 --> 0
c    ( b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0 ∧  p_374) -> (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧ -b^{2, 188}_0)
c  in CNF:
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_2
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_1
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_0
c  in DIMACS:
-5207  5208 -5209 -374 -5210 0
-5207  5208 -5209 -374 -5211 0
-5207  5208 -5209 -374 -5212 0

c  0+1 --> 1
c    (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧  p_374) -> (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0)
c  in CNF:
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_2
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_1
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨  b^{2, 188}_0
c  in DIMACS:
 5207  5208  5209 -374 -5210 0
 5207  5208  5209 -374 -5211 0
 5207  5208  5209 -374  5212 0

c  1+1 --> 2
c    (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0 ∧  p_374) -> (-b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0)
c  in CNF:
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_2
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨  b^{2, 188}_1
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ -p_374 ∨ -b^{2, 188}_0
c  in DIMACS:
 5207  5208 -5209 -374 -5210 0
 5207  5208 -5209 -374  5211 0
 5207  5208 -5209 -374 -5212 0

c  2+1 --> break 
c    (-b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧  p_374) -> break
c  in CNF:
c     b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 5207 -5208  5209 -374 1162 0


c  2-1 --> 1
c    (-b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧ -p_374) -> (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0)
c  in CNF:
c     b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_2
c     b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_1
c     b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨  b^{2, 188}_0
c  in DIMACS:
 5207 -5208  5209  374 -5210 0
 5207 -5208  5209  374 -5211 0
 5207 -5208  5209  374  5212 0

c  1-1 --> 0
c    (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0 ∧ -p_374) -> (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧ -b^{2, 188}_0)
c  in CNF:
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_2
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_1
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_0
c  in DIMACS:
 5207  5208 -5209  374 -5210 0
 5207  5208 -5209  374 -5211 0
 5207  5208 -5209  374 -5212 0

c  0-1 --> -1
c    (-b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧ -p_374) -> ( b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0)
c  in CNF:
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨  b^{2, 188}_2
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_1
c     b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨  b^{2, 188}_0
c  in DIMACS:
 5207  5208  5209  374  5210 0
 5207  5208  5209  374 -5211 0
 5207  5208  5209  374  5212 0

c  -1-1 --> -2
c    ( b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧  b^{2, 187}_0 ∧ -p_374) -> ( b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0)
c  in CNF:
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨  b^{2, 188}_2
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨  b^{2, 188}_1
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨  p_374 ∨ -b^{2, 188}_0
c  in DIMACS:
-5207  5208 -5209  374  5210 0
-5207  5208 -5209  374  5211 0
-5207  5208 -5209  374 -5212 0

c  -2-1 --> break 
c    ( b^{2, 187}_2 ∧  b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨  b^{2, 187}_0 ∨  p_374 ∨ break
c  in DIMACS:
-5207 -5208  5209  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 187}_2 ∧ -b^{2, 187}_1 ∧ -b^{2, 187}_0 ∧ true) 
c  in CNF:
c    -b^{2, 187}_2 ∨  b^{2, 187}_1 ∨  b^{2, 187}_0 ∨ false 
c  in DIMACS:
-5207  5208  5209  0

c  3 does not represent an automaton state.
c    -(-b^{2, 187}_2 ∧  b^{2, 187}_1 ∧  b^{2, 187}_0 ∧ true) 
c  in CNF:
c     b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ false 
c  in DIMACS:
 5207 -5208 -5209  0
c  -3 does not represent an automaton state.
c    -( b^{2, 187}_2 ∧  b^{2, 187}_1 ∧  b^{2, 187}_0 ∧ true) 
c  in CNF:
c    -b^{2, 187}_2 ∨ -b^{2, 187}_1 ∨ -b^{2, 187}_0 ∨ false 
c  in DIMACS:
-5207 -5208 -5209  0

c i = 188
c  -2+1 --> -1
c    ( b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧  p_376) -> ( b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0)
c  in CNF:
c    -b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨  b^{2, 189}_2
c    -b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_1
c    -b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨  b^{2, 189}_0
c  in DIMACS:
-5210 -5211  5212 -376  5213 0
-5210 -5211  5212 -376 -5214 0
-5210 -5211  5212 -376  5215 0

c  -1+1 --> 0
c    ( b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0 ∧  p_376) -> (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧ -b^{2, 189}_0)
c  in CNF:
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_2
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_1
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_0
c  in DIMACS:
-5210  5211 -5212 -376 -5213 0
-5210  5211 -5212 -376 -5214 0
-5210  5211 -5212 -376 -5215 0

c  0+1 --> 1
c    (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧  p_376) -> (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0)
c  in CNF:
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_2
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_1
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨  b^{2, 189}_0
c  in DIMACS:
 5210  5211  5212 -376 -5213 0
 5210  5211  5212 -376 -5214 0
 5210  5211  5212 -376  5215 0

c  1+1 --> 2
c    (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0 ∧  p_376) -> (-b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0)
c  in CNF:
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_2
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨  b^{2, 189}_1
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ -p_376 ∨ -b^{2, 189}_0
c  in DIMACS:
 5210  5211 -5212 -376 -5213 0
 5210  5211 -5212 -376  5214 0
 5210  5211 -5212 -376 -5215 0

c  2+1 --> break 
c    (-b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧  p_376) -> break
c  in CNF:
c     b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 5210 -5211  5212 -376 1162 0


c  2-1 --> 1
c    (-b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧ -p_376) -> (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0)
c  in CNF:
c     b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_2
c     b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_1
c     b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨  b^{2, 189}_0
c  in DIMACS:
 5210 -5211  5212  376 -5213 0
 5210 -5211  5212  376 -5214 0
 5210 -5211  5212  376  5215 0

c  1-1 --> 0
c    (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0 ∧ -p_376) -> (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧ -b^{2, 189}_0)
c  in CNF:
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_2
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_1
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_0
c  in DIMACS:
 5210  5211 -5212  376 -5213 0
 5210  5211 -5212  376 -5214 0
 5210  5211 -5212  376 -5215 0

c  0-1 --> -1
c    (-b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧ -p_376) -> ( b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0)
c  in CNF:
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨  b^{2, 189}_2
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_1
c     b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨  b^{2, 189}_0
c  in DIMACS:
 5210  5211  5212  376  5213 0
 5210  5211  5212  376 -5214 0
 5210  5211  5212  376  5215 0

c  -1-1 --> -2
c    ( b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧  b^{2, 188}_0 ∧ -p_376) -> ( b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0)
c  in CNF:
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨  b^{2, 189}_2
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨  b^{2, 189}_1
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨  p_376 ∨ -b^{2, 189}_0
c  in DIMACS:
-5210  5211 -5212  376  5213 0
-5210  5211 -5212  376  5214 0
-5210  5211 -5212  376 -5215 0

c  -2-1 --> break 
c    ( b^{2, 188}_2 ∧  b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨  b^{2, 188}_0 ∨  p_376 ∨ break
c  in DIMACS:
-5210 -5211  5212  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 188}_2 ∧ -b^{2, 188}_1 ∧ -b^{2, 188}_0 ∧ true) 
c  in CNF:
c    -b^{2, 188}_2 ∨  b^{2, 188}_1 ∨  b^{2, 188}_0 ∨ false 
c  in DIMACS:
-5210  5211  5212  0

c  3 does not represent an automaton state.
c    -(-b^{2, 188}_2 ∧  b^{2, 188}_1 ∧  b^{2, 188}_0 ∧ true) 
c  in CNF:
c     b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ false 
c  in DIMACS:
 5210 -5211 -5212  0
c  -3 does not represent an automaton state.
c    -( b^{2, 188}_2 ∧  b^{2, 188}_1 ∧  b^{2, 188}_0 ∧ true) 
c  in CNF:
c    -b^{2, 188}_2 ∨ -b^{2, 188}_1 ∨ -b^{2, 188}_0 ∨ false 
c  in DIMACS:
-5210 -5211 -5212  0

c i = 189
c  -2+1 --> -1
c    ( b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧  p_378) -> ( b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0)
c  in CNF:
c    -b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨  b^{2, 190}_2
c    -b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_1
c    -b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨  b^{2, 190}_0
c  in DIMACS:
-5213 -5214  5215 -378  5216 0
-5213 -5214  5215 -378 -5217 0
-5213 -5214  5215 -378  5218 0

c  -1+1 --> 0
c    ( b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0 ∧  p_378) -> (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧ -b^{2, 190}_0)
c  in CNF:
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_2
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_1
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_0
c  in DIMACS:
-5213  5214 -5215 -378 -5216 0
-5213  5214 -5215 -378 -5217 0
-5213  5214 -5215 -378 -5218 0

c  0+1 --> 1
c    (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧  p_378) -> (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0)
c  in CNF:
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_2
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_1
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨  b^{2, 190}_0
c  in DIMACS:
 5213  5214  5215 -378 -5216 0
 5213  5214  5215 -378 -5217 0
 5213  5214  5215 -378  5218 0

c  1+1 --> 2
c    (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0 ∧  p_378) -> (-b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0)
c  in CNF:
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_2
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨  b^{2, 190}_1
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ -p_378 ∨ -b^{2, 190}_0
c  in DIMACS:
 5213  5214 -5215 -378 -5216 0
 5213  5214 -5215 -378  5217 0
 5213  5214 -5215 -378 -5218 0

c  2+1 --> break 
c    (-b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧  p_378) -> break
c  in CNF:
c     b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 5213 -5214  5215 -378 1162 0


c  2-1 --> 1
c    (-b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧ -p_378) -> (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0)
c  in CNF:
c     b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_2
c     b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_1
c     b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨  b^{2, 190}_0
c  in DIMACS:
 5213 -5214  5215  378 -5216 0
 5213 -5214  5215  378 -5217 0
 5213 -5214  5215  378  5218 0

c  1-1 --> 0
c    (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0 ∧ -p_378) -> (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧ -b^{2, 190}_0)
c  in CNF:
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_2
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_1
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_0
c  in DIMACS:
 5213  5214 -5215  378 -5216 0
 5213  5214 -5215  378 -5217 0
 5213  5214 -5215  378 -5218 0

c  0-1 --> -1
c    (-b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧ -p_378) -> ( b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0)
c  in CNF:
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨  b^{2, 190}_2
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_1
c     b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨  b^{2, 190}_0
c  in DIMACS:
 5213  5214  5215  378  5216 0
 5213  5214  5215  378 -5217 0
 5213  5214  5215  378  5218 0

c  -1-1 --> -2
c    ( b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧  b^{2, 189}_0 ∧ -p_378) -> ( b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0)
c  in CNF:
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨  b^{2, 190}_2
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨  b^{2, 190}_1
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨  p_378 ∨ -b^{2, 190}_0
c  in DIMACS:
-5213  5214 -5215  378  5216 0
-5213  5214 -5215  378  5217 0
-5213  5214 -5215  378 -5218 0

c  -2-1 --> break 
c    ( b^{2, 189}_2 ∧  b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨  b^{2, 189}_0 ∨  p_378 ∨ break
c  in DIMACS:
-5213 -5214  5215  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 189}_2 ∧ -b^{2, 189}_1 ∧ -b^{2, 189}_0 ∧ true) 
c  in CNF:
c    -b^{2, 189}_2 ∨  b^{2, 189}_1 ∨  b^{2, 189}_0 ∨ false 
c  in DIMACS:
-5213  5214  5215  0

c  3 does not represent an automaton state.
c    -(-b^{2, 189}_2 ∧  b^{2, 189}_1 ∧  b^{2, 189}_0 ∧ true) 
c  in CNF:
c     b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ false 
c  in DIMACS:
 5213 -5214 -5215  0
c  -3 does not represent an automaton state.
c    -( b^{2, 189}_2 ∧  b^{2, 189}_1 ∧  b^{2, 189}_0 ∧ true) 
c  in CNF:
c    -b^{2, 189}_2 ∨ -b^{2, 189}_1 ∨ -b^{2, 189}_0 ∨ false 
c  in DIMACS:
-5213 -5214 -5215  0

c i = 190
c  -2+1 --> -1
c    ( b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧  p_380) -> ( b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0)
c  in CNF:
c    -b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨  b^{2, 191}_2
c    -b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_1
c    -b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨  b^{2, 191}_0
c  in DIMACS:
-5216 -5217  5218 -380  5219 0
-5216 -5217  5218 -380 -5220 0
-5216 -5217  5218 -380  5221 0

c  -1+1 --> 0
c    ( b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0 ∧  p_380) -> (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧ -b^{2, 191}_0)
c  in CNF:
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_2
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_1
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_0
c  in DIMACS:
-5216  5217 -5218 -380 -5219 0
-5216  5217 -5218 -380 -5220 0
-5216  5217 -5218 -380 -5221 0

c  0+1 --> 1
c    (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧  p_380) -> (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0)
c  in CNF:
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_2
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_1
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨  b^{2, 191}_0
c  in DIMACS:
 5216  5217  5218 -380 -5219 0
 5216  5217  5218 -380 -5220 0
 5216  5217  5218 -380  5221 0

c  1+1 --> 2
c    (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0 ∧  p_380) -> (-b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0)
c  in CNF:
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_2
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨  b^{2, 191}_1
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ -p_380 ∨ -b^{2, 191}_0
c  in DIMACS:
 5216  5217 -5218 -380 -5219 0
 5216  5217 -5218 -380  5220 0
 5216  5217 -5218 -380 -5221 0

c  2+1 --> break 
c    (-b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧  p_380) -> break
c  in CNF:
c     b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 5216 -5217  5218 -380 1162 0


c  2-1 --> 1
c    (-b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧ -p_380) -> (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0)
c  in CNF:
c     b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_2
c     b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_1
c     b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨  b^{2, 191}_0
c  in DIMACS:
 5216 -5217  5218  380 -5219 0
 5216 -5217  5218  380 -5220 0
 5216 -5217  5218  380  5221 0

c  1-1 --> 0
c    (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0 ∧ -p_380) -> (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧ -b^{2, 191}_0)
c  in CNF:
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_2
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_1
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_0
c  in DIMACS:
 5216  5217 -5218  380 -5219 0
 5216  5217 -5218  380 -5220 0
 5216  5217 -5218  380 -5221 0

c  0-1 --> -1
c    (-b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧ -p_380) -> ( b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0)
c  in CNF:
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨  b^{2, 191}_2
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_1
c     b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨  b^{2, 191}_0
c  in DIMACS:
 5216  5217  5218  380  5219 0
 5216  5217  5218  380 -5220 0
 5216  5217  5218  380  5221 0

c  -1-1 --> -2
c    ( b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧  b^{2, 190}_0 ∧ -p_380) -> ( b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0)
c  in CNF:
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨  b^{2, 191}_2
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨  b^{2, 191}_1
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨  p_380 ∨ -b^{2, 191}_0
c  in DIMACS:
-5216  5217 -5218  380  5219 0
-5216  5217 -5218  380  5220 0
-5216  5217 -5218  380 -5221 0

c  -2-1 --> break 
c    ( b^{2, 190}_2 ∧  b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨  b^{2, 190}_0 ∨  p_380 ∨ break
c  in DIMACS:
-5216 -5217  5218  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 190}_2 ∧ -b^{2, 190}_1 ∧ -b^{2, 190}_0 ∧ true) 
c  in CNF:
c    -b^{2, 190}_2 ∨  b^{2, 190}_1 ∨  b^{2, 190}_0 ∨ false 
c  in DIMACS:
-5216  5217  5218  0

c  3 does not represent an automaton state.
c    -(-b^{2, 190}_2 ∧  b^{2, 190}_1 ∧  b^{2, 190}_0 ∧ true) 
c  in CNF:
c     b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ false 
c  in DIMACS:
 5216 -5217 -5218  0
c  -3 does not represent an automaton state.
c    -( b^{2, 190}_2 ∧  b^{2, 190}_1 ∧  b^{2, 190}_0 ∧ true) 
c  in CNF:
c    -b^{2, 190}_2 ∨ -b^{2, 190}_1 ∨ -b^{2, 190}_0 ∨ false 
c  in DIMACS:
-5216 -5217 -5218  0

c i = 191
c  -2+1 --> -1
c    ( b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧  p_382) -> ( b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0)
c  in CNF:
c    -b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨  b^{2, 192}_2
c    -b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_1
c    -b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨  b^{2, 192}_0
c  in DIMACS:
-5219 -5220  5221 -382  5222 0
-5219 -5220  5221 -382 -5223 0
-5219 -5220  5221 -382  5224 0

c  -1+1 --> 0
c    ( b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0 ∧  p_382) -> (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧ -b^{2, 192}_0)
c  in CNF:
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_2
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_1
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_0
c  in DIMACS:
-5219  5220 -5221 -382 -5222 0
-5219  5220 -5221 -382 -5223 0
-5219  5220 -5221 -382 -5224 0

c  0+1 --> 1
c    (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧  p_382) -> (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0)
c  in CNF:
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_2
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_1
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨  b^{2, 192}_0
c  in DIMACS:
 5219  5220  5221 -382 -5222 0
 5219  5220  5221 -382 -5223 0
 5219  5220  5221 -382  5224 0

c  1+1 --> 2
c    (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0 ∧  p_382) -> (-b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0)
c  in CNF:
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_2
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨  b^{2, 192}_1
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ -p_382 ∨ -b^{2, 192}_0
c  in DIMACS:
 5219  5220 -5221 -382 -5222 0
 5219  5220 -5221 -382  5223 0
 5219  5220 -5221 -382 -5224 0

c  2+1 --> break 
c    (-b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧  p_382) -> break
c  in CNF:
c     b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ -p_382 ∨ break
c  in DIMACS:
 5219 -5220  5221 -382 1162 0


c  2-1 --> 1
c    (-b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧ -p_382) -> (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0)
c  in CNF:
c     b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_2
c     b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_1
c     b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨  b^{2, 192}_0
c  in DIMACS:
 5219 -5220  5221  382 -5222 0
 5219 -5220  5221  382 -5223 0
 5219 -5220  5221  382  5224 0

c  1-1 --> 0
c    (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0 ∧ -p_382) -> (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧ -b^{2, 192}_0)
c  in CNF:
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_2
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_1
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_0
c  in DIMACS:
 5219  5220 -5221  382 -5222 0
 5219  5220 -5221  382 -5223 0
 5219  5220 -5221  382 -5224 0

c  0-1 --> -1
c    (-b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧ -p_382) -> ( b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0)
c  in CNF:
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨  b^{2, 192}_2
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_1
c     b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨  b^{2, 192}_0
c  in DIMACS:
 5219  5220  5221  382  5222 0
 5219  5220  5221  382 -5223 0
 5219  5220  5221  382  5224 0

c  -1-1 --> -2
c    ( b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧  b^{2, 191}_0 ∧ -p_382) -> ( b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0)
c  in CNF:
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨  b^{2, 192}_2
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨  b^{2, 192}_1
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨  p_382 ∨ -b^{2, 192}_0
c  in DIMACS:
-5219  5220 -5221  382  5222 0
-5219  5220 -5221  382  5223 0
-5219  5220 -5221  382 -5224 0

c  -2-1 --> break 
c    ( b^{2, 191}_2 ∧  b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧ -p_382) -> break
c  in CNF:
c    -b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨  b^{2, 191}_0 ∨  p_382 ∨ break
c  in DIMACS:
-5219 -5220  5221  382 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 191}_2 ∧ -b^{2, 191}_1 ∧ -b^{2, 191}_0 ∧ true) 
c  in CNF:
c    -b^{2, 191}_2 ∨  b^{2, 191}_1 ∨  b^{2, 191}_0 ∨ false 
c  in DIMACS:
-5219  5220  5221  0

c  3 does not represent an automaton state.
c    -(-b^{2, 191}_2 ∧  b^{2, 191}_1 ∧  b^{2, 191}_0 ∧ true) 
c  in CNF:
c     b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ false 
c  in DIMACS:
 5219 -5220 -5221  0
c  -3 does not represent an automaton state.
c    -( b^{2, 191}_2 ∧  b^{2, 191}_1 ∧  b^{2, 191}_0 ∧ true) 
c  in CNF:
c    -b^{2, 191}_2 ∨ -b^{2, 191}_1 ∨ -b^{2, 191}_0 ∨ false 
c  in DIMACS:
-5219 -5220 -5221  0

c i = 192
c  -2+1 --> -1
c    ( b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧  p_384) -> ( b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0)
c  in CNF:
c    -b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨  b^{2, 193}_2
c    -b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_1
c    -b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨  b^{2, 193}_0
c  in DIMACS:
-5222 -5223  5224 -384  5225 0
-5222 -5223  5224 -384 -5226 0
-5222 -5223  5224 -384  5227 0

c  -1+1 --> 0
c    ( b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0 ∧  p_384) -> (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧ -b^{2, 193}_0)
c  in CNF:
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_2
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_1
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_0
c  in DIMACS:
-5222  5223 -5224 -384 -5225 0
-5222  5223 -5224 -384 -5226 0
-5222  5223 -5224 -384 -5227 0

c  0+1 --> 1
c    (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧  p_384) -> (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0)
c  in CNF:
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_2
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_1
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨  b^{2, 193}_0
c  in DIMACS:
 5222  5223  5224 -384 -5225 0
 5222  5223  5224 -384 -5226 0
 5222  5223  5224 -384  5227 0

c  1+1 --> 2
c    (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0 ∧  p_384) -> (-b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0)
c  in CNF:
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_2
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨  b^{2, 193}_1
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ -p_384 ∨ -b^{2, 193}_0
c  in DIMACS:
 5222  5223 -5224 -384 -5225 0
 5222  5223 -5224 -384  5226 0
 5222  5223 -5224 -384 -5227 0

c  2+1 --> break 
c    (-b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧  p_384) -> break
c  in CNF:
c     b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 5222 -5223  5224 -384 1162 0


c  2-1 --> 1
c    (-b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧ -p_384) -> (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0)
c  in CNF:
c     b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_2
c     b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_1
c     b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨  b^{2, 193}_0
c  in DIMACS:
 5222 -5223  5224  384 -5225 0
 5222 -5223  5224  384 -5226 0
 5222 -5223  5224  384  5227 0

c  1-1 --> 0
c    (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0 ∧ -p_384) -> (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧ -b^{2, 193}_0)
c  in CNF:
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_2
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_1
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_0
c  in DIMACS:
 5222  5223 -5224  384 -5225 0
 5222  5223 -5224  384 -5226 0
 5222  5223 -5224  384 -5227 0

c  0-1 --> -1
c    (-b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧ -p_384) -> ( b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0)
c  in CNF:
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨  b^{2, 193}_2
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_1
c     b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨  b^{2, 193}_0
c  in DIMACS:
 5222  5223  5224  384  5225 0
 5222  5223  5224  384 -5226 0
 5222  5223  5224  384  5227 0

c  -1-1 --> -2
c    ( b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧  b^{2, 192}_0 ∧ -p_384) -> ( b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0)
c  in CNF:
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨  b^{2, 193}_2
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨  b^{2, 193}_1
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨  p_384 ∨ -b^{2, 193}_0
c  in DIMACS:
-5222  5223 -5224  384  5225 0
-5222  5223 -5224  384  5226 0
-5222  5223 -5224  384 -5227 0

c  -2-1 --> break 
c    ( b^{2, 192}_2 ∧  b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨  b^{2, 192}_0 ∨  p_384 ∨ break
c  in DIMACS:
-5222 -5223  5224  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 192}_2 ∧ -b^{2, 192}_1 ∧ -b^{2, 192}_0 ∧ true) 
c  in CNF:
c    -b^{2, 192}_2 ∨  b^{2, 192}_1 ∨  b^{2, 192}_0 ∨ false 
c  in DIMACS:
-5222  5223  5224  0

c  3 does not represent an automaton state.
c    -(-b^{2, 192}_2 ∧  b^{2, 192}_1 ∧  b^{2, 192}_0 ∧ true) 
c  in CNF:
c     b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ false 
c  in DIMACS:
 5222 -5223 -5224  0
c  -3 does not represent an automaton state.
c    -( b^{2, 192}_2 ∧  b^{2, 192}_1 ∧  b^{2, 192}_0 ∧ true) 
c  in CNF:
c    -b^{2, 192}_2 ∨ -b^{2, 192}_1 ∨ -b^{2, 192}_0 ∨ false 
c  in DIMACS:
-5222 -5223 -5224  0

c i = 193
c  -2+1 --> -1
c    ( b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧  p_386) -> ( b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0)
c  in CNF:
c    -b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨  b^{2, 194}_2
c    -b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_1
c    -b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨  b^{2, 194}_0
c  in DIMACS:
-5225 -5226  5227 -386  5228 0
-5225 -5226  5227 -386 -5229 0
-5225 -5226  5227 -386  5230 0

c  -1+1 --> 0
c    ( b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0 ∧  p_386) -> (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧ -b^{2, 194}_0)
c  in CNF:
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_2
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_1
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_0
c  in DIMACS:
-5225  5226 -5227 -386 -5228 0
-5225  5226 -5227 -386 -5229 0
-5225  5226 -5227 -386 -5230 0

c  0+1 --> 1
c    (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧  p_386) -> (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0)
c  in CNF:
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_2
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_1
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨  b^{2, 194}_0
c  in DIMACS:
 5225  5226  5227 -386 -5228 0
 5225  5226  5227 -386 -5229 0
 5225  5226  5227 -386  5230 0

c  1+1 --> 2
c    (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0 ∧  p_386) -> (-b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0)
c  in CNF:
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_2
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨  b^{2, 194}_1
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ -p_386 ∨ -b^{2, 194}_0
c  in DIMACS:
 5225  5226 -5227 -386 -5228 0
 5225  5226 -5227 -386  5229 0
 5225  5226 -5227 -386 -5230 0

c  2+1 --> break 
c    (-b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧  p_386) -> break
c  in CNF:
c     b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ -p_386 ∨ break
c  in DIMACS:
 5225 -5226  5227 -386 1162 0


c  2-1 --> 1
c    (-b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧ -p_386) -> (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0)
c  in CNF:
c     b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_2
c     b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_1
c     b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨  b^{2, 194}_0
c  in DIMACS:
 5225 -5226  5227  386 -5228 0
 5225 -5226  5227  386 -5229 0
 5225 -5226  5227  386  5230 0

c  1-1 --> 0
c    (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0 ∧ -p_386) -> (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧ -b^{2, 194}_0)
c  in CNF:
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_2
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_1
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_0
c  in DIMACS:
 5225  5226 -5227  386 -5228 0
 5225  5226 -5227  386 -5229 0
 5225  5226 -5227  386 -5230 0

c  0-1 --> -1
c    (-b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧ -p_386) -> ( b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0)
c  in CNF:
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨  b^{2, 194}_2
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_1
c     b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨  b^{2, 194}_0
c  in DIMACS:
 5225  5226  5227  386  5228 0
 5225  5226  5227  386 -5229 0
 5225  5226  5227  386  5230 0

c  -1-1 --> -2
c    ( b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧  b^{2, 193}_0 ∧ -p_386) -> ( b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0)
c  in CNF:
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨  b^{2, 194}_2
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨  b^{2, 194}_1
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨  p_386 ∨ -b^{2, 194}_0
c  in DIMACS:
-5225  5226 -5227  386  5228 0
-5225  5226 -5227  386  5229 0
-5225  5226 -5227  386 -5230 0

c  -2-1 --> break 
c    ( b^{2, 193}_2 ∧  b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧ -p_386) -> break
c  in CNF:
c    -b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨  b^{2, 193}_0 ∨  p_386 ∨ break
c  in DIMACS:
-5225 -5226  5227  386 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 193}_2 ∧ -b^{2, 193}_1 ∧ -b^{2, 193}_0 ∧ true) 
c  in CNF:
c    -b^{2, 193}_2 ∨  b^{2, 193}_1 ∨  b^{2, 193}_0 ∨ false 
c  in DIMACS:
-5225  5226  5227  0

c  3 does not represent an automaton state.
c    -(-b^{2, 193}_2 ∧  b^{2, 193}_1 ∧  b^{2, 193}_0 ∧ true) 
c  in CNF:
c     b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ false 
c  in DIMACS:
 5225 -5226 -5227  0
c  -3 does not represent an automaton state.
c    -( b^{2, 193}_2 ∧  b^{2, 193}_1 ∧  b^{2, 193}_0 ∧ true) 
c  in CNF:
c    -b^{2, 193}_2 ∨ -b^{2, 193}_1 ∨ -b^{2, 193}_0 ∨ false 
c  in DIMACS:
-5225 -5226 -5227  0

c i = 194
c  -2+1 --> -1
c    ( b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧  p_388) -> ( b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0)
c  in CNF:
c    -b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨  b^{2, 195}_2
c    -b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_1
c    -b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨  b^{2, 195}_0
c  in DIMACS:
-5228 -5229  5230 -388  5231 0
-5228 -5229  5230 -388 -5232 0
-5228 -5229  5230 -388  5233 0

c  -1+1 --> 0
c    ( b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0 ∧  p_388) -> (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧ -b^{2, 195}_0)
c  in CNF:
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_2
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_1
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_0
c  in DIMACS:
-5228  5229 -5230 -388 -5231 0
-5228  5229 -5230 -388 -5232 0
-5228  5229 -5230 -388 -5233 0

c  0+1 --> 1
c    (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧  p_388) -> (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0)
c  in CNF:
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_2
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_1
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨  b^{2, 195}_0
c  in DIMACS:
 5228  5229  5230 -388 -5231 0
 5228  5229  5230 -388 -5232 0
 5228  5229  5230 -388  5233 0

c  1+1 --> 2
c    (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0 ∧  p_388) -> (-b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0)
c  in CNF:
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_2
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨  b^{2, 195}_1
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ -p_388 ∨ -b^{2, 195}_0
c  in DIMACS:
 5228  5229 -5230 -388 -5231 0
 5228  5229 -5230 -388  5232 0
 5228  5229 -5230 -388 -5233 0

c  2+1 --> break 
c    (-b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧  p_388) -> break
c  in CNF:
c     b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ -p_388 ∨ break
c  in DIMACS:
 5228 -5229  5230 -388 1162 0


c  2-1 --> 1
c    (-b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧ -p_388) -> (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0)
c  in CNF:
c     b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_2
c     b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_1
c     b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨  b^{2, 195}_0
c  in DIMACS:
 5228 -5229  5230  388 -5231 0
 5228 -5229  5230  388 -5232 0
 5228 -5229  5230  388  5233 0

c  1-1 --> 0
c    (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0 ∧ -p_388) -> (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧ -b^{2, 195}_0)
c  in CNF:
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_2
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_1
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_0
c  in DIMACS:
 5228  5229 -5230  388 -5231 0
 5228  5229 -5230  388 -5232 0
 5228  5229 -5230  388 -5233 0

c  0-1 --> -1
c    (-b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧ -p_388) -> ( b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0)
c  in CNF:
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨  b^{2, 195}_2
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_1
c     b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨  b^{2, 195}_0
c  in DIMACS:
 5228  5229  5230  388  5231 0
 5228  5229  5230  388 -5232 0
 5228  5229  5230  388  5233 0

c  -1-1 --> -2
c    ( b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧  b^{2, 194}_0 ∧ -p_388) -> ( b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0)
c  in CNF:
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨  b^{2, 195}_2
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨  b^{2, 195}_1
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨  p_388 ∨ -b^{2, 195}_0
c  in DIMACS:
-5228  5229 -5230  388  5231 0
-5228  5229 -5230  388  5232 0
-5228  5229 -5230  388 -5233 0

c  -2-1 --> break 
c    ( b^{2, 194}_2 ∧  b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧ -p_388) -> break
c  in CNF:
c    -b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨  b^{2, 194}_0 ∨  p_388 ∨ break
c  in DIMACS:
-5228 -5229  5230  388 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 194}_2 ∧ -b^{2, 194}_1 ∧ -b^{2, 194}_0 ∧ true) 
c  in CNF:
c    -b^{2, 194}_2 ∨  b^{2, 194}_1 ∨  b^{2, 194}_0 ∨ false 
c  in DIMACS:
-5228  5229  5230  0

c  3 does not represent an automaton state.
c    -(-b^{2, 194}_2 ∧  b^{2, 194}_1 ∧  b^{2, 194}_0 ∧ true) 
c  in CNF:
c     b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ false 
c  in DIMACS:
 5228 -5229 -5230  0
c  -3 does not represent an automaton state.
c    -( b^{2, 194}_2 ∧  b^{2, 194}_1 ∧  b^{2, 194}_0 ∧ true) 
c  in CNF:
c    -b^{2, 194}_2 ∨ -b^{2, 194}_1 ∨ -b^{2, 194}_0 ∨ false 
c  in DIMACS:
-5228 -5229 -5230  0

c i = 195
c  -2+1 --> -1
c    ( b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧  p_390) -> ( b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0)
c  in CNF:
c    -b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨  b^{2, 196}_2
c    -b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_1
c    -b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨  b^{2, 196}_0
c  in DIMACS:
-5231 -5232  5233 -390  5234 0
-5231 -5232  5233 -390 -5235 0
-5231 -5232  5233 -390  5236 0

c  -1+1 --> 0
c    ( b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0 ∧  p_390) -> (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧ -b^{2, 196}_0)
c  in CNF:
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_2
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_1
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_0
c  in DIMACS:
-5231  5232 -5233 -390 -5234 0
-5231  5232 -5233 -390 -5235 0
-5231  5232 -5233 -390 -5236 0

c  0+1 --> 1
c    (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧  p_390) -> (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0)
c  in CNF:
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_2
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_1
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨  b^{2, 196}_0
c  in DIMACS:
 5231  5232  5233 -390 -5234 0
 5231  5232  5233 -390 -5235 0
 5231  5232  5233 -390  5236 0

c  1+1 --> 2
c    (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0 ∧  p_390) -> (-b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0)
c  in CNF:
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_2
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨  b^{2, 196}_1
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ -p_390 ∨ -b^{2, 196}_0
c  in DIMACS:
 5231  5232 -5233 -390 -5234 0
 5231  5232 -5233 -390  5235 0
 5231  5232 -5233 -390 -5236 0

c  2+1 --> break 
c    (-b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧  p_390) -> break
c  in CNF:
c     b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 5231 -5232  5233 -390 1162 0


c  2-1 --> 1
c    (-b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧ -p_390) -> (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0)
c  in CNF:
c     b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_2
c     b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_1
c     b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨  b^{2, 196}_0
c  in DIMACS:
 5231 -5232  5233  390 -5234 0
 5231 -5232  5233  390 -5235 0
 5231 -5232  5233  390  5236 0

c  1-1 --> 0
c    (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0 ∧ -p_390) -> (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧ -b^{2, 196}_0)
c  in CNF:
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_2
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_1
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_0
c  in DIMACS:
 5231  5232 -5233  390 -5234 0
 5231  5232 -5233  390 -5235 0
 5231  5232 -5233  390 -5236 0

c  0-1 --> -1
c    (-b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧ -p_390) -> ( b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0)
c  in CNF:
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨  b^{2, 196}_2
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_1
c     b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨  b^{2, 196}_0
c  in DIMACS:
 5231  5232  5233  390  5234 0
 5231  5232  5233  390 -5235 0
 5231  5232  5233  390  5236 0

c  -1-1 --> -2
c    ( b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧  b^{2, 195}_0 ∧ -p_390) -> ( b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0)
c  in CNF:
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨  b^{2, 196}_2
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨  b^{2, 196}_1
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨  p_390 ∨ -b^{2, 196}_0
c  in DIMACS:
-5231  5232 -5233  390  5234 0
-5231  5232 -5233  390  5235 0
-5231  5232 -5233  390 -5236 0

c  -2-1 --> break 
c    ( b^{2, 195}_2 ∧  b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨  b^{2, 195}_0 ∨  p_390 ∨ break
c  in DIMACS:
-5231 -5232  5233  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 195}_2 ∧ -b^{2, 195}_1 ∧ -b^{2, 195}_0 ∧ true) 
c  in CNF:
c    -b^{2, 195}_2 ∨  b^{2, 195}_1 ∨  b^{2, 195}_0 ∨ false 
c  in DIMACS:
-5231  5232  5233  0

c  3 does not represent an automaton state.
c    -(-b^{2, 195}_2 ∧  b^{2, 195}_1 ∧  b^{2, 195}_0 ∧ true) 
c  in CNF:
c     b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ false 
c  in DIMACS:
 5231 -5232 -5233  0
c  -3 does not represent an automaton state.
c    -( b^{2, 195}_2 ∧  b^{2, 195}_1 ∧  b^{2, 195}_0 ∧ true) 
c  in CNF:
c    -b^{2, 195}_2 ∨ -b^{2, 195}_1 ∨ -b^{2, 195}_0 ∨ false 
c  in DIMACS:
-5231 -5232 -5233  0

c i = 196
c  -2+1 --> -1
c    ( b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧  p_392) -> ( b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0)
c  in CNF:
c    -b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨  b^{2, 197}_2
c    -b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_1
c    -b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨  b^{2, 197}_0
c  in DIMACS:
-5234 -5235  5236 -392  5237 0
-5234 -5235  5236 -392 -5238 0
-5234 -5235  5236 -392  5239 0

c  -1+1 --> 0
c    ( b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0 ∧  p_392) -> (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧ -b^{2, 197}_0)
c  in CNF:
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_2
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_1
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_0
c  in DIMACS:
-5234  5235 -5236 -392 -5237 0
-5234  5235 -5236 -392 -5238 0
-5234  5235 -5236 -392 -5239 0

c  0+1 --> 1
c    (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧  p_392) -> (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0)
c  in CNF:
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_2
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_1
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨  b^{2, 197}_0
c  in DIMACS:
 5234  5235  5236 -392 -5237 0
 5234  5235  5236 -392 -5238 0
 5234  5235  5236 -392  5239 0

c  1+1 --> 2
c    (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0 ∧  p_392) -> (-b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0)
c  in CNF:
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_2
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨  b^{2, 197}_1
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ -p_392 ∨ -b^{2, 197}_0
c  in DIMACS:
 5234  5235 -5236 -392 -5237 0
 5234  5235 -5236 -392  5238 0
 5234  5235 -5236 -392 -5239 0

c  2+1 --> break 
c    (-b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧  p_392) -> break
c  in CNF:
c     b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 5234 -5235  5236 -392 1162 0


c  2-1 --> 1
c    (-b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧ -p_392) -> (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0)
c  in CNF:
c     b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_2
c     b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_1
c     b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨  b^{2, 197}_0
c  in DIMACS:
 5234 -5235  5236  392 -5237 0
 5234 -5235  5236  392 -5238 0
 5234 -5235  5236  392  5239 0

c  1-1 --> 0
c    (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0 ∧ -p_392) -> (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧ -b^{2, 197}_0)
c  in CNF:
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_2
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_1
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_0
c  in DIMACS:
 5234  5235 -5236  392 -5237 0
 5234  5235 -5236  392 -5238 0
 5234  5235 -5236  392 -5239 0

c  0-1 --> -1
c    (-b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧ -p_392) -> ( b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0)
c  in CNF:
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨  b^{2, 197}_2
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_1
c     b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨  b^{2, 197}_0
c  in DIMACS:
 5234  5235  5236  392  5237 0
 5234  5235  5236  392 -5238 0
 5234  5235  5236  392  5239 0

c  -1-1 --> -2
c    ( b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧  b^{2, 196}_0 ∧ -p_392) -> ( b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0)
c  in CNF:
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨  b^{2, 197}_2
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨  b^{2, 197}_1
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨  p_392 ∨ -b^{2, 197}_0
c  in DIMACS:
-5234  5235 -5236  392  5237 0
-5234  5235 -5236  392  5238 0
-5234  5235 -5236  392 -5239 0

c  -2-1 --> break 
c    ( b^{2, 196}_2 ∧  b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨  b^{2, 196}_0 ∨  p_392 ∨ break
c  in DIMACS:
-5234 -5235  5236  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 196}_2 ∧ -b^{2, 196}_1 ∧ -b^{2, 196}_0 ∧ true) 
c  in CNF:
c    -b^{2, 196}_2 ∨  b^{2, 196}_1 ∨  b^{2, 196}_0 ∨ false 
c  in DIMACS:
-5234  5235  5236  0

c  3 does not represent an automaton state.
c    -(-b^{2, 196}_2 ∧  b^{2, 196}_1 ∧  b^{2, 196}_0 ∧ true) 
c  in CNF:
c     b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ false 
c  in DIMACS:
 5234 -5235 -5236  0
c  -3 does not represent an automaton state.
c    -( b^{2, 196}_2 ∧  b^{2, 196}_1 ∧  b^{2, 196}_0 ∧ true) 
c  in CNF:
c    -b^{2, 196}_2 ∨ -b^{2, 196}_1 ∨ -b^{2, 196}_0 ∨ false 
c  in DIMACS:
-5234 -5235 -5236  0

c i = 197
c  -2+1 --> -1
c    ( b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧  p_394) -> ( b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0)
c  in CNF:
c    -b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨  b^{2, 198}_2
c    -b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_1
c    -b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨  b^{2, 198}_0
c  in DIMACS:
-5237 -5238  5239 -394  5240 0
-5237 -5238  5239 -394 -5241 0
-5237 -5238  5239 -394  5242 0

c  -1+1 --> 0
c    ( b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0 ∧  p_394) -> (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧ -b^{2, 198}_0)
c  in CNF:
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_2
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_1
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_0
c  in DIMACS:
-5237  5238 -5239 -394 -5240 0
-5237  5238 -5239 -394 -5241 0
-5237  5238 -5239 -394 -5242 0

c  0+1 --> 1
c    (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧  p_394) -> (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0)
c  in CNF:
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_2
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_1
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨  b^{2, 198}_0
c  in DIMACS:
 5237  5238  5239 -394 -5240 0
 5237  5238  5239 -394 -5241 0
 5237  5238  5239 -394  5242 0

c  1+1 --> 2
c    (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0 ∧  p_394) -> (-b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0)
c  in CNF:
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_2
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨  b^{2, 198}_1
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ -p_394 ∨ -b^{2, 198}_0
c  in DIMACS:
 5237  5238 -5239 -394 -5240 0
 5237  5238 -5239 -394  5241 0
 5237  5238 -5239 -394 -5242 0

c  2+1 --> break 
c    (-b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧  p_394) -> break
c  in CNF:
c     b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ -p_394 ∨ break
c  in DIMACS:
 5237 -5238  5239 -394 1162 0


c  2-1 --> 1
c    (-b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧ -p_394) -> (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0)
c  in CNF:
c     b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_2
c     b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_1
c     b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨  b^{2, 198}_0
c  in DIMACS:
 5237 -5238  5239  394 -5240 0
 5237 -5238  5239  394 -5241 0
 5237 -5238  5239  394  5242 0

c  1-1 --> 0
c    (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0 ∧ -p_394) -> (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧ -b^{2, 198}_0)
c  in CNF:
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_2
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_1
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_0
c  in DIMACS:
 5237  5238 -5239  394 -5240 0
 5237  5238 -5239  394 -5241 0
 5237  5238 -5239  394 -5242 0

c  0-1 --> -1
c    (-b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧ -p_394) -> ( b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0)
c  in CNF:
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨  b^{2, 198}_2
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_1
c     b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨  b^{2, 198}_0
c  in DIMACS:
 5237  5238  5239  394  5240 0
 5237  5238  5239  394 -5241 0
 5237  5238  5239  394  5242 0

c  -1-1 --> -2
c    ( b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧  b^{2, 197}_0 ∧ -p_394) -> ( b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0)
c  in CNF:
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨  b^{2, 198}_2
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨  b^{2, 198}_1
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨  p_394 ∨ -b^{2, 198}_0
c  in DIMACS:
-5237  5238 -5239  394  5240 0
-5237  5238 -5239  394  5241 0
-5237  5238 -5239  394 -5242 0

c  -2-1 --> break 
c    ( b^{2, 197}_2 ∧  b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧ -p_394) -> break
c  in CNF:
c    -b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨  b^{2, 197}_0 ∨  p_394 ∨ break
c  in DIMACS:
-5237 -5238  5239  394 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 197}_2 ∧ -b^{2, 197}_1 ∧ -b^{2, 197}_0 ∧ true) 
c  in CNF:
c    -b^{2, 197}_2 ∨  b^{2, 197}_1 ∨  b^{2, 197}_0 ∨ false 
c  in DIMACS:
-5237  5238  5239  0

c  3 does not represent an automaton state.
c    -(-b^{2, 197}_2 ∧  b^{2, 197}_1 ∧  b^{2, 197}_0 ∧ true) 
c  in CNF:
c     b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ false 
c  in DIMACS:
 5237 -5238 -5239  0
c  -3 does not represent an automaton state.
c    -( b^{2, 197}_2 ∧  b^{2, 197}_1 ∧  b^{2, 197}_0 ∧ true) 
c  in CNF:
c    -b^{2, 197}_2 ∨ -b^{2, 197}_1 ∨ -b^{2, 197}_0 ∨ false 
c  in DIMACS:
-5237 -5238 -5239  0

c i = 198
c  -2+1 --> -1
c    ( b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧  p_396) -> ( b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0)
c  in CNF:
c    -b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨  b^{2, 199}_2
c    -b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_1
c    -b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨  b^{2, 199}_0
c  in DIMACS:
-5240 -5241  5242 -396  5243 0
-5240 -5241  5242 -396 -5244 0
-5240 -5241  5242 -396  5245 0

c  -1+1 --> 0
c    ( b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0 ∧  p_396) -> (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧ -b^{2, 199}_0)
c  in CNF:
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_2
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_1
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_0
c  in DIMACS:
-5240  5241 -5242 -396 -5243 0
-5240  5241 -5242 -396 -5244 0
-5240  5241 -5242 -396 -5245 0

c  0+1 --> 1
c    (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧  p_396) -> (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0)
c  in CNF:
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_2
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_1
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨  b^{2, 199}_0
c  in DIMACS:
 5240  5241  5242 -396 -5243 0
 5240  5241  5242 -396 -5244 0
 5240  5241  5242 -396  5245 0

c  1+1 --> 2
c    (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0 ∧  p_396) -> (-b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0)
c  in CNF:
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_2
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨  b^{2, 199}_1
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ -p_396 ∨ -b^{2, 199}_0
c  in DIMACS:
 5240  5241 -5242 -396 -5243 0
 5240  5241 -5242 -396  5244 0
 5240  5241 -5242 -396 -5245 0

c  2+1 --> break 
c    (-b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧  p_396) -> break
c  in CNF:
c     b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 5240 -5241  5242 -396 1162 0


c  2-1 --> 1
c    (-b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧ -p_396) -> (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0)
c  in CNF:
c     b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_2
c     b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_1
c     b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨  b^{2, 199}_0
c  in DIMACS:
 5240 -5241  5242  396 -5243 0
 5240 -5241  5242  396 -5244 0
 5240 -5241  5242  396  5245 0

c  1-1 --> 0
c    (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0 ∧ -p_396) -> (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧ -b^{2, 199}_0)
c  in CNF:
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_2
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_1
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_0
c  in DIMACS:
 5240  5241 -5242  396 -5243 0
 5240  5241 -5242  396 -5244 0
 5240  5241 -5242  396 -5245 0

c  0-1 --> -1
c    (-b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧ -p_396) -> ( b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0)
c  in CNF:
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨  b^{2, 199}_2
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_1
c     b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨  b^{2, 199}_0
c  in DIMACS:
 5240  5241  5242  396  5243 0
 5240  5241  5242  396 -5244 0
 5240  5241  5242  396  5245 0

c  -1-1 --> -2
c    ( b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧  b^{2, 198}_0 ∧ -p_396) -> ( b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0)
c  in CNF:
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨  b^{2, 199}_2
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨  b^{2, 199}_1
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨  p_396 ∨ -b^{2, 199}_0
c  in DIMACS:
-5240  5241 -5242  396  5243 0
-5240  5241 -5242  396  5244 0
-5240  5241 -5242  396 -5245 0

c  -2-1 --> break 
c    ( b^{2, 198}_2 ∧  b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨  b^{2, 198}_0 ∨  p_396 ∨ break
c  in DIMACS:
-5240 -5241  5242  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 198}_2 ∧ -b^{2, 198}_1 ∧ -b^{2, 198}_0 ∧ true) 
c  in CNF:
c    -b^{2, 198}_2 ∨  b^{2, 198}_1 ∨  b^{2, 198}_0 ∨ false 
c  in DIMACS:
-5240  5241  5242  0

c  3 does not represent an automaton state.
c    -(-b^{2, 198}_2 ∧  b^{2, 198}_1 ∧  b^{2, 198}_0 ∧ true) 
c  in CNF:
c     b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ false 
c  in DIMACS:
 5240 -5241 -5242  0
c  -3 does not represent an automaton state.
c    -( b^{2, 198}_2 ∧  b^{2, 198}_1 ∧  b^{2, 198}_0 ∧ true) 
c  in CNF:
c    -b^{2, 198}_2 ∨ -b^{2, 198}_1 ∨ -b^{2, 198}_0 ∨ false 
c  in DIMACS:
-5240 -5241 -5242  0

c i = 199
c  -2+1 --> -1
c    ( b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧  p_398) -> ( b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0)
c  in CNF:
c    -b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨  b^{2, 200}_2
c    -b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_1
c    -b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨  b^{2, 200}_0
c  in DIMACS:
-5243 -5244  5245 -398  5246 0
-5243 -5244  5245 -398 -5247 0
-5243 -5244  5245 -398  5248 0

c  -1+1 --> 0
c    ( b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0 ∧  p_398) -> (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧ -b^{2, 200}_0)
c  in CNF:
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_2
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_1
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_0
c  in DIMACS:
-5243  5244 -5245 -398 -5246 0
-5243  5244 -5245 -398 -5247 0
-5243  5244 -5245 -398 -5248 0

c  0+1 --> 1
c    (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧  p_398) -> (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0)
c  in CNF:
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_2
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_1
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨  b^{2, 200}_0
c  in DIMACS:
 5243  5244  5245 -398 -5246 0
 5243  5244  5245 -398 -5247 0
 5243  5244  5245 -398  5248 0

c  1+1 --> 2
c    (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0 ∧  p_398) -> (-b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0)
c  in CNF:
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_2
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨  b^{2, 200}_1
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ -p_398 ∨ -b^{2, 200}_0
c  in DIMACS:
 5243  5244 -5245 -398 -5246 0
 5243  5244 -5245 -398  5247 0
 5243  5244 -5245 -398 -5248 0

c  2+1 --> break 
c    (-b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧  p_398) -> break
c  in CNF:
c     b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ -p_398 ∨ break
c  in DIMACS:
 5243 -5244  5245 -398 1162 0


c  2-1 --> 1
c    (-b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧ -p_398) -> (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0)
c  in CNF:
c     b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_2
c     b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_1
c     b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨  b^{2, 200}_0
c  in DIMACS:
 5243 -5244  5245  398 -5246 0
 5243 -5244  5245  398 -5247 0
 5243 -5244  5245  398  5248 0

c  1-1 --> 0
c    (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0 ∧ -p_398) -> (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧ -b^{2, 200}_0)
c  in CNF:
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_2
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_1
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_0
c  in DIMACS:
 5243  5244 -5245  398 -5246 0
 5243  5244 -5245  398 -5247 0
 5243  5244 -5245  398 -5248 0

c  0-1 --> -1
c    (-b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧ -p_398) -> ( b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0)
c  in CNF:
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨  b^{2, 200}_2
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_1
c     b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨  b^{2, 200}_0
c  in DIMACS:
 5243  5244  5245  398  5246 0
 5243  5244  5245  398 -5247 0
 5243  5244  5245  398  5248 0

c  -1-1 --> -2
c    ( b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧  b^{2, 199}_0 ∧ -p_398) -> ( b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0)
c  in CNF:
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨  b^{2, 200}_2
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨  b^{2, 200}_1
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨  p_398 ∨ -b^{2, 200}_0
c  in DIMACS:
-5243  5244 -5245  398  5246 0
-5243  5244 -5245  398  5247 0
-5243  5244 -5245  398 -5248 0

c  -2-1 --> break 
c    ( b^{2, 199}_2 ∧  b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧ -p_398) -> break
c  in CNF:
c    -b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨  b^{2, 199}_0 ∨  p_398 ∨ break
c  in DIMACS:
-5243 -5244  5245  398 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 199}_2 ∧ -b^{2, 199}_1 ∧ -b^{2, 199}_0 ∧ true) 
c  in CNF:
c    -b^{2, 199}_2 ∨  b^{2, 199}_1 ∨  b^{2, 199}_0 ∨ false 
c  in DIMACS:
-5243  5244  5245  0

c  3 does not represent an automaton state.
c    -(-b^{2, 199}_2 ∧  b^{2, 199}_1 ∧  b^{2, 199}_0 ∧ true) 
c  in CNF:
c     b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ false 
c  in DIMACS:
 5243 -5244 -5245  0
c  -3 does not represent an automaton state.
c    -( b^{2, 199}_2 ∧  b^{2, 199}_1 ∧  b^{2, 199}_0 ∧ true) 
c  in CNF:
c    -b^{2, 199}_2 ∨ -b^{2, 199}_1 ∨ -b^{2, 199}_0 ∨ false 
c  in DIMACS:
-5243 -5244 -5245  0

c i = 200
c  -2+1 --> -1
c    ( b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧  p_400) -> ( b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0)
c  in CNF:
c    -b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨  b^{2, 201}_2
c    -b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_1
c    -b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨  b^{2, 201}_0
c  in DIMACS:
-5246 -5247  5248 -400  5249 0
-5246 -5247  5248 -400 -5250 0
-5246 -5247  5248 -400  5251 0

c  -1+1 --> 0
c    ( b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0 ∧  p_400) -> (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧ -b^{2, 201}_0)
c  in CNF:
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_2
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_1
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_0
c  in DIMACS:
-5246  5247 -5248 -400 -5249 0
-5246  5247 -5248 -400 -5250 0
-5246  5247 -5248 -400 -5251 0

c  0+1 --> 1
c    (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧  p_400) -> (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0)
c  in CNF:
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_2
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_1
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨  b^{2, 201}_0
c  in DIMACS:
 5246  5247  5248 -400 -5249 0
 5246  5247  5248 -400 -5250 0
 5246  5247  5248 -400  5251 0

c  1+1 --> 2
c    (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0 ∧  p_400) -> (-b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0)
c  in CNF:
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_2
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨  b^{2, 201}_1
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ -p_400 ∨ -b^{2, 201}_0
c  in DIMACS:
 5246  5247 -5248 -400 -5249 0
 5246  5247 -5248 -400  5250 0
 5246  5247 -5248 -400 -5251 0

c  2+1 --> break 
c    (-b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧  p_400) -> break
c  in CNF:
c     b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 5246 -5247  5248 -400 1162 0


c  2-1 --> 1
c    (-b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧ -p_400) -> (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0)
c  in CNF:
c     b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_2
c     b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_1
c     b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨  b^{2, 201}_0
c  in DIMACS:
 5246 -5247  5248  400 -5249 0
 5246 -5247  5248  400 -5250 0
 5246 -5247  5248  400  5251 0

c  1-1 --> 0
c    (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0 ∧ -p_400) -> (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧ -b^{2, 201}_0)
c  in CNF:
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_2
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_1
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_0
c  in DIMACS:
 5246  5247 -5248  400 -5249 0
 5246  5247 -5248  400 -5250 0
 5246  5247 -5248  400 -5251 0

c  0-1 --> -1
c    (-b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧ -p_400) -> ( b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0)
c  in CNF:
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨  b^{2, 201}_2
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_1
c     b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨  b^{2, 201}_0
c  in DIMACS:
 5246  5247  5248  400  5249 0
 5246  5247  5248  400 -5250 0
 5246  5247  5248  400  5251 0

c  -1-1 --> -2
c    ( b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧  b^{2, 200}_0 ∧ -p_400) -> ( b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0)
c  in CNF:
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨  b^{2, 201}_2
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨  b^{2, 201}_1
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨  p_400 ∨ -b^{2, 201}_0
c  in DIMACS:
-5246  5247 -5248  400  5249 0
-5246  5247 -5248  400  5250 0
-5246  5247 -5248  400 -5251 0

c  -2-1 --> break 
c    ( b^{2, 200}_2 ∧  b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨  b^{2, 200}_0 ∨  p_400 ∨ break
c  in DIMACS:
-5246 -5247  5248  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 200}_2 ∧ -b^{2, 200}_1 ∧ -b^{2, 200}_0 ∧ true) 
c  in CNF:
c    -b^{2, 200}_2 ∨  b^{2, 200}_1 ∨  b^{2, 200}_0 ∨ false 
c  in DIMACS:
-5246  5247  5248  0

c  3 does not represent an automaton state.
c    -(-b^{2, 200}_2 ∧  b^{2, 200}_1 ∧  b^{2, 200}_0 ∧ true) 
c  in CNF:
c     b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ false 
c  in DIMACS:
 5246 -5247 -5248  0
c  -3 does not represent an automaton state.
c    -( b^{2, 200}_2 ∧  b^{2, 200}_1 ∧  b^{2, 200}_0 ∧ true) 
c  in CNF:
c    -b^{2, 200}_2 ∨ -b^{2, 200}_1 ∨ -b^{2, 200}_0 ∨ false 
c  in DIMACS:
-5246 -5247 -5248  0

c i = 201
c  -2+1 --> -1
c    ( b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧  p_402) -> ( b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0)
c  in CNF:
c    -b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨  b^{2, 202}_2
c    -b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_1
c    -b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨  b^{2, 202}_0
c  in DIMACS:
-5249 -5250  5251 -402  5252 0
-5249 -5250  5251 -402 -5253 0
-5249 -5250  5251 -402  5254 0

c  -1+1 --> 0
c    ( b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0 ∧  p_402) -> (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧ -b^{2, 202}_0)
c  in CNF:
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_2
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_1
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_0
c  in DIMACS:
-5249  5250 -5251 -402 -5252 0
-5249  5250 -5251 -402 -5253 0
-5249  5250 -5251 -402 -5254 0

c  0+1 --> 1
c    (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧  p_402) -> (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0)
c  in CNF:
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_2
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_1
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨  b^{2, 202}_0
c  in DIMACS:
 5249  5250  5251 -402 -5252 0
 5249  5250  5251 -402 -5253 0
 5249  5250  5251 -402  5254 0

c  1+1 --> 2
c    (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0 ∧  p_402) -> (-b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0)
c  in CNF:
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_2
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨  b^{2, 202}_1
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ -p_402 ∨ -b^{2, 202}_0
c  in DIMACS:
 5249  5250 -5251 -402 -5252 0
 5249  5250 -5251 -402  5253 0
 5249  5250 -5251 -402 -5254 0

c  2+1 --> break 
c    (-b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧  p_402) -> break
c  in CNF:
c     b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 5249 -5250  5251 -402 1162 0


c  2-1 --> 1
c    (-b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧ -p_402) -> (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0)
c  in CNF:
c     b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_2
c     b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_1
c     b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨  b^{2, 202}_0
c  in DIMACS:
 5249 -5250  5251  402 -5252 0
 5249 -5250  5251  402 -5253 0
 5249 -5250  5251  402  5254 0

c  1-1 --> 0
c    (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0 ∧ -p_402) -> (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧ -b^{2, 202}_0)
c  in CNF:
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_2
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_1
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_0
c  in DIMACS:
 5249  5250 -5251  402 -5252 0
 5249  5250 -5251  402 -5253 0
 5249  5250 -5251  402 -5254 0

c  0-1 --> -1
c    (-b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧ -p_402) -> ( b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0)
c  in CNF:
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨  b^{2, 202}_2
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_1
c     b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨  b^{2, 202}_0
c  in DIMACS:
 5249  5250  5251  402  5252 0
 5249  5250  5251  402 -5253 0
 5249  5250  5251  402  5254 0

c  -1-1 --> -2
c    ( b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧  b^{2, 201}_0 ∧ -p_402) -> ( b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0)
c  in CNF:
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨  b^{2, 202}_2
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨  b^{2, 202}_1
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨  p_402 ∨ -b^{2, 202}_0
c  in DIMACS:
-5249  5250 -5251  402  5252 0
-5249  5250 -5251  402  5253 0
-5249  5250 -5251  402 -5254 0

c  -2-1 --> break 
c    ( b^{2, 201}_2 ∧  b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨  b^{2, 201}_0 ∨  p_402 ∨ break
c  in DIMACS:
-5249 -5250  5251  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 201}_2 ∧ -b^{2, 201}_1 ∧ -b^{2, 201}_0 ∧ true) 
c  in CNF:
c    -b^{2, 201}_2 ∨  b^{2, 201}_1 ∨  b^{2, 201}_0 ∨ false 
c  in DIMACS:
-5249  5250  5251  0

c  3 does not represent an automaton state.
c    -(-b^{2, 201}_2 ∧  b^{2, 201}_1 ∧  b^{2, 201}_0 ∧ true) 
c  in CNF:
c     b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ false 
c  in DIMACS:
 5249 -5250 -5251  0
c  -3 does not represent an automaton state.
c    -( b^{2, 201}_2 ∧  b^{2, 201}_1 ∧  b^{2, 201}_0 ∧ true) 
c  in CNF:
c    -b^{2, 201}_2 ∨ -b^{2, 201}_1 ∨ -b^{2, 201}_0 ∨ false 
c  in DIMACS:
-5249 -5250 -5251  0

c i = 202
c  -2+1 --> -1
c    ( b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧  p_404) -> ( b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0)
c  in CNF:
c    -b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨  b^{2, 203}_2
c    -b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_1
c    -b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨  b^{2, 203}_0
c  in DIMACS:
-5252 -5253  5254 -404  5255 0
-5252 -5253  5254 -404 -5256 0
-5252 -5253  5254 -404  5257 0

c  -1+1 --> 0
c    ( b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0 ∧  p_404) -> (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧ -b^{2, 203}_0)
c  in CNF:
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_2
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_1
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_0
c  in DIMACS:
-5252  5253 -5254 -404 -5255 0
-5252  5253 -5254 -404 -5256 0
-5252  5253 -5254 -404 -5257 0

c  0+1 --> 1
c    (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧  p_404) -> (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0)
c  in CNF:
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_2
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_1
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨  b^{2, 203}_0
c  in DIMACS:
 5252  5253  5254 -404 -5255 0
 5252  5253  5254 -404 -5256 0
 5252  5253  5254 -404  5257 0

c  1+1 --> 2
c    (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0 ∧  p_404) -> (-b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0)
c  in CNF:
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_2
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨  b^{2, 203}_1
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ -p_404 ∨ -b^{2, 203}_0
c  in DIMACS:
 5252  5253 -5254 -404 -5255 0
 5252  5253 -5254 -404  5256 0
 5252  5253 -5254 -404 -5257 0

c  2+1 --> break 
c    (-b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧  p_404) -> break
c  in CNF:
c     b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ -p_404 ∨ break
c  in DIMACS:
 5252 -5253  5254 -404 1162 0


c  2-1 --> 1
c    (-b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧ -p_404) -> (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0)
c  in CNF:
c     b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_2
c     b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_1
c     b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨  b^{2, 203}_0
c  in DIMACS:
 5252 -5253  5254  404 -5255 0
 5252 -5253  5254  404 -5256 0
 5252 -5253  5254  404  5257 0

c  1-1 --> 0
c    (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0 ∧ -p_404) -> (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧ -b^{2, 203}_0)
c  in CNF:
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_2
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_1
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_0
c  in DIMACS:
 5252  5253 -5254  404 -5255 0
 5252  5253 -5254  404 -5256 0
 5252  5253 -5254  404 -5257 0

c  0-1 --> -1
c    (-b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧ -p_404) -> ( b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0)
c  in CNF:
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨  b^{2, 203}_2
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_1
c     b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨  b^{2, 203}_0
c  in DIMACS:
 5252  5253  5254  404  5255 0
 5252  5253  5254  404 -5256 0
 5252  5253  5254  404  5257 0

c  -1-1 --> -2
c    ( b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧  b^{2, 202}_0 ∧ -p_404) -> ( b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0)
c  in CNF:
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨  b^{2, 203}_2
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨  b^{2, 203}_1
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨  p_404 ∨ -b^{2, 203}_0
c  in DIMACS:
-5252  5253 -5254  404  5255 0
-5252  5253 -5254  404  5256 0
-5252  5253 -5254  404 -5257 0

c  -2-1 --> break 
c    ( b^{2, 202}_2 ∧  b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧ -p_404) -> break
c  in CNF:
c    -b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨  b^{2, 202}_0 ∨  p_404 ∨ break
c  in DIMACS:
-5252 -5253  5254  404 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 202}_2 ∧ -b^{2, 202}_1 ∧ -b^{2, 202}_0 ∧ true) 
c  in CNF:
c    -b^{2, 202}_2 ∨  b^{2, 202}_1 ∨  b^{2, 202}_0 ∨ false 
c  in DIMACS:
-5252  5253  5254  0

c  3 does not represent an automaton state.
c    -(-b^{2, 202}_2 ∧  b^{2, 202}_1 ∧  b^{2, 202}_0 ∧ true) 
c  in CNF:
c     b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ false 
c  in DIMACS:
 5252 -5253 -5254  0
c  -3 does not represent an automaton state.
c    -( b^{2, 202}_2 ∧  b^{2, 202}_1 ∧  b^{2, 202}_0 ∧ true) 
c  in CNF:
c    -b^{2, 202}_2 ∨ -b^{2, 202}_1 ∨ -b^{2, 202}_0 ∨ false 
c  in DIMACS:
-5252 -5253 -5254  0

c i = 203
c  -2+1 --> -1
c    ( b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧  p_406) -> ( b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0)
c  in CNF:
c    -b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨  b^{2, 204}_2
c    -b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_1
c    -b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨  b^{2, 204}_0
c  in DIMACS:
-5255 -5256  5257 -406  5258 0
-5255 -5256  5257 -406 -5259 0
-5255 -5256  5257 -406  5260 0

c  -1+1 --> 0
c    ( b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0 ∧  p_406) -> (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧ -b^{2, 204}_0)
c  in CNF:
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_2
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_1
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_0
c  in DIMACS:
-5255  5256 -5257 -406 -5258 0
-5255  5256 -5257 -406 -5259 0
-5255  5256 -5257 -406 -5260 0

c  0+1 --> 1
c    (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧  p_406) -> (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0)
c  in CNF:
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_2
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_1
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨  b^{2, 204}_0
c  in DIMACS:
 5255  5256  5257 -406 -5258 0
 5255  5256  5257 -406 -5259 0
 5255  5256  5257 -406  5260 0

c  1+1 --> 2
c    (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0 ∧  p_406) -> (-b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0)
c  in CNF:
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_2
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨  b^{2, 204}_1
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ -p_406 ∨ -b^{2, 204}_0
c  in DIMACS:
 5255  5256 -5257 -406 -5258 0
 5255  5256 -5257 -406  5259 0
 5255  5256 -5257 -406 -5260 0

c  2+1 --> break 
c    (-b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧  p_406) -> break
c  in CNF:
c     b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 5255 -5256  5257 -406 1162 0


c  2-1 --> 1
c    (-b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧ -p_406) -> (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0)
c  in CNF:
c     b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_2
c     b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_1
c     b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨  b^{2, 204}_0
c  in DIMACS:
 5255 -5256  5257  406 -5258 0
 5255 -5256  5257  406 -5259 0
 5255 -5256  5257  406  5260 0

c  1-1 --> 0
c    (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0 ∧ -p_406) -> (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧ -b^{2, 204}_0)
c  in CNF:
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_2
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_1
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_0
c  in DIMACS:
 5255  5256 -5257  406 -5258 0
 5255  5256 -5257  406 -5259 0
 5255  5256 -5257  406 -5260 0

c  0-1 --> -1
c    (-b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧ -p_406) -> ( b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0)
c  in CNF:
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨  b^{2, 204}_2
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_1
c     b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨  b^{2, 204}_0
c  in DIMACS:
 5255  5256  5257  406  5258 0
 5255  5256  5257  406 -5259 0
 5255  5256  5257  406  5260 0

c  -1-1 --> -2
c    ( b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧  b^{2, 203}_0 ∧ -p_406) -> ( b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0)
c  in CNF:
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨  b^{2, 204}_2
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨  b^{2, 204}_1
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨  p_406 ∨ -b^{2, 204}_0
c  in DIMACS:
-5255  5256 -5257  406  5258 0
-5255  5256 -5257  406  5259 0
-5255  5256 -5257  406 -5260 0

c  -2-1 --> break 
c    ( b^{2, 203}_2 ∧  b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨  b^{2, 203}_0 ∨  p_406 ∨ break
c  in DIMACS:
-5255 -5256  5257  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 203}_2 ∧ -b^{2, 203}_1 ∧ -b^{2, 203}_0 ∧ true) 
c  in CNF:
c    -b^{2, 203}_2 ∨  b^{2, 203}_1 ∨  b^{2, 203}_0 ∨ false 
c  in DIMACS:
-5255  5256  5257  0

c  3 does not represent an automaton state.
c    -(-b^{2, 203}_2 ∧  b^{2, 203}_1 ∧  b^{2, 203}_0 ∧ true) 
c  in CNF:
c     b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ false 
c  in DIMACS:
 5255 -5256 -5257  0
c  -3 does not represent an automaton state.
c    -( b^{2, 203}_2 ∧  b^{2, 203}_1 ∧  b^{2, 203}_0 ∧ true) 
c  in CNF:
c    -b^{2, 203}_2 ∨ -b^{2, 203}_1 ∨ -b^{2, 203}_0 ∨ false 
c  in DIMACS:
-5255 -5256 -5257  0

c i = 204
c  -2+1 --> -1
c    ( b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧  p_408) -> ( b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0)
c  in CNF:
c    -b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨  b^{2, 205}_2
c    -b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_1
c    -b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨  b^{2, 205}_0
c  in DIMACS:
-5258 -5259  5260 -408  5261 0
-5258 -5259  5260 -408 -5262 0
-5258 -5259  5260 -408  5263 0

c  -1+1 --> 0
c    ( b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0 ∧  p_408) -> (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧ -b^{2, 205}_0)
c  in CNF:
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_2
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_1
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_0
c  in DIMACS:
-5258  5259 -5260 -408 -5261 0
-5258  5259 -5260 -408 -5262 0
-5258  5259 -5260 -408 -5263 0

c  0+1 --> 1
c    (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧  p_408) -> (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0)
c  in CNF:
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_2
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_1
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨  b^{2, 205}_0
c  in DIMACS:
 5258  5259  5260 -408 -5261 0
 5258  5259  5260 -408 -5262 0
 5258  5259  5260 -408  5263 0

c  1+1 --> 2
c    (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0 ∧  p_408) -> (-b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0)
c  in CNF:
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_2
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨  b^{2, 205}_1
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ -p_408 ∨ -b^{2, 205}_0
c  in DIMACS:
 5258  5259 -5260 -408 -5261 0
 5258  5259 -5260 -408  5262 0
 5258  5259 -5260 -408 -5263 0

c  2+1 --> break 
c    (-b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧  p_408) -> break
c  in CNF:
c     b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 5258 -5259  5260 -408 1162 0


c  2-1 --> 1
c    (-b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧ -p_408) -> (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0)
c  in CNF:
c     b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_2
c     b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_1
c     b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨  b^{2, 205}_0
c  in DIMACS:
 5258 -5259  5260  408 -5261 0
 5258 -5259  5260  408 -5262 0
 5258 -5259  5260  408  5263 0

c  1-1 --> 0
c    (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0 ∧ -p_408) -> (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧ -b^{2, 205}_0)
c  in CNF:
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_2
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_1
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_0
c  in DIMACS:
 5258  5259 -5260  408 -5261 0
 5258  5259 -5260  408 -5262 0
 5258  5259 -5260  408 -5263 0

c  0-1 --> -1
c    (-b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧ -p_408) -> ( b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0)
c  in CNF:
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨  b^{2, 205}_2
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_1
c     b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨  b^{2, 205}_0
c  in DIMACS:
 5258  5259  5260  408  5261 0
 5258  5259  5260  408 -5262 0
 5258  5259  5260  408  5263 0

c  -1-1 --> -2
c    ( b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧  b^{2, 204}_0 ∧ -p_408) -> ( b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0)
c  in CNF:
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨  b^{2, 205}_2
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨  b^{2, 205}_1
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨  p_408 ∨ -b^{2, 205}_0
c  in DIMACS:
-5258  5259 -5260  408  5261 0
-5258  5259 -5260  408  5262 0
-5258  5259 -5260  408 -5263 0

c  -2-1 --> break 
c    ( b^{2, 204}_2 ∧  b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨  b^{2, 204}_0 ∨  p_408 ∨ break
c  in DIMACS:
-5258 -5259  5260  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 204}_2 ∧ -b^{2, 204}_1 ∧ -b^{2, 204}_0 ∧ true) 
c  in CNF:
c    -b^{2, 204}_2 ∨  b^{2, 204}_1 ∨  b^{2, 204}_0 ∨ false 
c  in DIMACS:
-5258  5259  5260  0

c  3 does not represent an automaton state.
c    -(-b^{2, 204}_2 ∧  b^{2, 204}_1 ∧  b^{2, 204}_0 ∧ true) 
c  in CNF:
c     b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ false 
c  in DIMACS:
 5258 -5259 -5260  0
c  -3 does not represent an automaton state.
c    -( b^{2, 204}_2 ∧  b^{2, 204}_1 ∧  b^{2, 204}_0 ∧ true) 
c  in CNF:
c    -b^{2, 204}_2 ∨ -b^{2, 204}_1 ∨ -b^{2, 204}_0 ∨ false 
c  in DIMACS:
-5258 -5259 -5260  0

c i = 205
c  -2+1 --> -1
c    ( b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧  p_410) -> ( b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0)
c  in CNF:
c    -b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨  b^{2, 206}_2
c    -b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_1
c    -b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨  b^{2, 206}_0
c  in DIMACS:
-5261 -5262  5263 -410  5264 0
-5261 -5262  5263 -410 -5265 0
-5261 -5262  5263 -410  5266 0

c  -1+1 --> 0
c    ( b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0 ∧  p_410) -> (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧ -b^{2, 206}_0)
c  in CNF:
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_2
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_1
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_0
c  in DIMACS:
-5261  5262 -5263 -410 -5264 0
-5261  5262 -5263 -410 -5265 0
-5261  5262 -5263 -410 -5266 0

c  0+1 --> 1
c    (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧  p_410) -> (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0)
c  in CNF:
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_2
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_1
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨  b^{2, 206}_0
c  in DIMACS:
 5261  5262  5263 -410 -5264 0
 5261  5262  5263 -410 -5265 0
 5261  5262  5263 -410  5266 0

c  1+1 --> 2
c    (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0 ∧  p_410) -> (-b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0)
c  in CNF:
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_2
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨  b^{2, 206}_1
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ -p_410 ∨ -b^{2, 206}_0
c  in DIMACS:
 5261  5262 -5263 -410 -5264 0
 5261  5262 -5263 -410  5265 0
 5261  5262 -5263 -410 -5266 0

c  2+1 --> break 
c    (-b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧  p_410) -> break
c  in CNF:
c     b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 5261 -5262  5263 -410 1162 0


c  2-1 --> 1
c    (-b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧ -p_410) -> (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0)
c  in CNF:
c     b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_2
c     b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_1
c     b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨  b^{2, 206}_0
c  in DIMACS:
 5261 -5262  5263  410 -5264 0
 5261 -5262  5263  410 -5265 0
 5261 -5262  5263  410  5266 0

c  1-1 --> 0
c    (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0 ∧ -p_410) -> (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧ -b^{2, 206}_0)
c  in CNF:
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_2
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_1
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_0
c  in DIMACS:
 5261  5262 -5263  410 -5264 0
 5261  5262 -5263  410 -5265 0
 5261  5262 -5263  410 -5266 0

c  0-1 --> -1
c    (-b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧ -p_410) -> ( b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0)
c  in CNF:
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨  b^{2, 206}_2
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_1
c     b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨  b^{2, 206}_0
c  in DIMACS:
 5261  5262  5263  410  5264 0
 5261  5262  5263  410 -5265 0
 5261  5262  5263  410  5266 0

c  -1-1 --> -2
c    ( b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧  b^{2, 205}_0 ∧ -p_410) -> ( b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0)
c  in CNF:
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨  b^{2, 206}_2
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨  b^{2, 206}_1
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨  p_410 ∨ -b^{2, 206}_0
c  in DIMACS:
-5261  5262 -5263  410  5264 0
-5261  5262 -5263  410  5265 0
-5261  5262 -5263  410 -5266 0

c  -2-1 --> break 
c    ( b^{2, 205}_2 ∧  b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨  b^{2, 205}_0 ∨  p_410 ∨ break
c  in DIMACS:
-5261 -5262  5263  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 205}_2 ∧ -b^{2, 205}_1 ∧ -b^{2, 205}_0 ∧ true) 
c  in CNF:
c    -b^{2, 205}_2 ∨  b^{2, 205}_1 ∨  b^{2, 205}_0 ∨ false 
c  in DIMACS:
-5261  5262  5263  0

c  3 does not represent an automaton state.
c    -(-b^{2, 205}_2 ∧  b^{2, 205}_1 ∧  b^{2, 205}_0 ∧ true) 
c  in CNF:
c     b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ false 
c  in DIMACS:
 5261 -5262 -5263  0
c  -3 does not represent an automaton state.
c    -( b^{2, 205}_2 ∧  b^{2, 205}_1 ∧  b^{2, 205}_0 ∧ true) 
c  in CNF:
c    -b^{2, 205}_2 ∨ -b^{2, 205}_1 ∨ -b^{2, 205}_0 ∨ false 
c  in DIMACS:
-5261 -5262 -5263  0

c i = 206
c  -2+1 --> -1
c    ( b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧  p_412) -> ( b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0)
c  in CNF:
c    -b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨  b^{2, 207}_2
c    -b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_1
c    -b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨  b^{2, 207}_0
c  in DIMACS:
-5264 -5265  5266 -412  5267 0
-5264 -5265  5266 -412 -5268 0
-5264 -5265  5266 -412  5269 0

c  -1+1 --> 0
c    ( b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0 ∧  p_412) -> (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧ -b^{2, 207}_0)
c  in CNF:
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_2
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_1
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_0
c  in DIMACS:
-5264  5265 -5266 -412 -5267 0
-5264  5265 -5266 -412 -5268 0
-5264  5265 -5266 -412 -5269 0

c  0+1 --> 1
c    (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧  p_412) -> (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0)
c  in CNF:
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_2
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_1
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨  b^{2, 207}_0
c  in DIMACS:
 5264  5265  5266 -412 -5267 0
 5264  5265  5266 -412 -5268 0
 5264  5265  5266 -412  5269 0

c  1+1 --> 2
c    (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0 ∧  p_412) -> (-b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0)
c  in CNF:
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_2
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨  b^{2, 207}_1
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ -p_412 ∨ -b^{2, 207}_0
c  in DIMACS:
 5264  5265 -5266 -412 -5267 0
 5264  5265 -5266 -412  5268 0
 5264  5265 -5266 -412 -5269 0

c  2+1 --> break 
c    (-b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧  p_412) -> break
c  in CNF:
c     b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ -p_412 ∨ break
c  in DIMACS:
 5264 -5265  5266 -412 1162 0


c  2-1 --> 1
c    (-b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧ -p_412) -> (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0)
c  in CNF:
c     b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_2
c     b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_1
c     b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨  b^{2, 207}_0
c  in DIMACS:
 5264 -5265  5266  412 -5267 0
 5264 -5265  5266  412 -5268 0
 5264 -5265  5266  412  5269 0

c  1-1 --> 0
c    (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0 ∧ -p_412) -> (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧ -b^{2, 207}_0)
c  in CNF:
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_2
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_1
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_0
c  in DIMACS:
 5264  5265 -5266  412 -5267 0
 5264  5265 -5266  412 -5268 0
 5264  5265 -5266  412 -5269 0

c  0-1 --> -1
c    (-b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧ -p_412) -> ( b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0)
c  in CNF:
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨  b^{2, 207}_2
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_1
c     b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨  b^{2, 207}_0
c  in DIMACS:
 5264  5265  5266  412  5267 0
 5264  5265  5266  412 -5268 0
 5264  5265  5266  412  5269 0

c  -1-1 --> -2
c    ( b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧  b^{2, 206}_0 ∧ -p_412) -> ( b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0)
c  in CNF:
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨  b^{2, 207}_2
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨  b^{2, 207}_1
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨  p_412 ∨ -b^{2, 207}_0
c  in DIMACS:
-5264  5265 -5266  412  5267 0
-5264  5265 -5266  412  5268 0
-5264  5265 -5266  412 -5269 0

c  -2-1 --> break 
c    ( b^{2, 206}_2 ∧  b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧ -p_412) -> break
c  in CNF:
c    -b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨  b^{2, 206}_0 ∨  p_412 ∨ break
c  in DIMACS:
-5264 -5265  5266  412 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 206}_2 ∧ -b^{2, 206}_1 ∧ -b^{2, 206}_0 ∧ true) 
c  in CNF:
c    -b^{2, 206}_2 ∨  b^{2, 206}_1 ∨  b^{2, 206}_0 ∨ false 
c  in DIMACS:
-5264  5265  5266  0

c  3 does not represent an automaton state.
c    -(-b^{2, 206}_2 ∧  b^{2, 206}_1 ∧  b^{2, 206}_0 ∧ true) 
c  in CNF:
c     b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ false 
c  in DIMACS:
 5264 -5265 -5266  0
c  -3 does not represent an automaton state.
c    -( b^{2, 206}_2 ∧  b^{2, 206}_1 ∧  b^{2, 206}_0 ∧ true) 
c  in CNF:
c    -b^{2, 206}_2 ∨ -b^{2, 206}_1 ∨ -b^{2, 206}_0 ∨ false 
c  in DIMACS:
-5264 -5265 -5266  0

c i = 207
c  -2+1 --> -1
c    ( b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧  p_414) -> ( b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0)
c  in CNF:
c    -b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨  b^{2, 208}_2
c    -b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_1
c    -b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨  b^{2, 208}_0
c  in DIMACS:
-5267 -5268  5269 -414  5270 0
-5267 -5268  5269 -414 -5271 0
-5267 -5268  5269 -414  5272 0

c  -1+1 --> 0
c    ( b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0 ∧  p_414) -> (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧ -b^{2, 208}_0)
c  in CNF:
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_2
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_1
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_0
c  in DIMACS:
-5267  5268 -5269 -414 -5270 0
-5267  5268 -5269 -414 -5271 0
-5267  5268 -5269 -414 -5272 0

c  0+1 --> 1
c    (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧  p_414) -> (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0)
c  in CNF:
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_2
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_1
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨  b^{2, 208}_0
c  in DIMACS:
 5267  5268  5269 -414 -5270 0
 5267  5268  5269 -414 -5271 0
 5267  5268  5269 -414  5272 0

c  1+1 --> 2
c    (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0 ∧  p_414) -> (-b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0)
c  in CNF:
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_2
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨  b^{2, 208}_1
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ -p_414 ∨ -b^{2, 208}_0
c  in DIMACS:
 5267  5268 -5269 -414 -5270 0
 5267  5268 -5269 -414  5271 0
 5267  5268 -5269 -414 -5272 0

c  2+1 --> break 
c    (-b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧  p_414) -> break
c  in CNF:
c     b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 5267 -5268  5269 -414 1162 0


c  2-1 --> 1
c    (-b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧ -p_414) -> (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0)
c  in CNF:
c     b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_2
c     b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_1
c     b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨  b^{2, 208}_0
c  in DIMACS:
 5267 -5268  5269  414 -5270 0
 5267 -5268  5269  414 -5271 0
 5267 -5268  5269  414  5272 0

c  1-1 --> 0
c    (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0 ∧ -p_414) -> (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧ -b^{2, 208}_0)
c  in CNF:
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_2
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_1
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_0
c  in DIMACS:
 5267  5268 -5269  414 -5270 0
 5267  5268 -5269  414 -5271 0
 5267  5268 -5269  414 -5272 0

c  0-1 --> -1
c    (-b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧ -p_414) -> ( b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0)
c  in CNF:
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨  b^{2, 208}_2
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_1
c     b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨  b^{2, 208}_0
c  in DIMACS:
 5267  5268  5269  414  5270 0
 5267  5268  5269  414 -5271 0
 5267  5268  5269  414  5272 0

c  -1-1 --> -2
c    ( b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧  b^{2, 207}_0 ∧ -p_414) -> ( b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0)
c  in CNF:
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨  b^{2, 208}_2
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨  b^{2, 208}_1
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨  p_414 ∨ -b^{2, 208}_0
c  in DIMACS:
-5267  5268 -5269  414  5270 0
-5267  5268 -5269  414  5271 0
-5267  5268 -5269  414 -5272 0

c  -2-1 --> break 
c    ( b^{2, 207}_2 ∧  b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨  b^{2, 207}_0 ∨  p_414 ∨ break
c  in DIMACS:
-5267 -5268  5269  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 207}_2 ∧ -b^{2, 207}_1 ∧ -b^{2, 207}_0 ∧ true) 
c  in CNF:
c    -b^{2, 207}_2 ∨  b^{2, 207}_1 ∨  b^{2, 207}_0 ∨ false 
c  in DIMACS:
-5267  5268  5269  0

c  3 does not represent an automaton state.
c    -(-b^{2, 207}_2 ∧  b^{2, 207}_1 ∧  b^{2, 207}_0 ∧ true) 
c  in CNF:
c     b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ false 
c  in DIMACS:
 5267 -5268 -5269  0
c  -3 does not represent an automaton state.
c    -( b^{2, 207}_2 ∧  b^{2, 207}_1 ∧  b^{2, 207}_0 ∧ true) 
c  in CNF:
c    -b^{2, 207}_2 ∨ -b^{2, 207}_1 ∨ -b^{2, 207}_0 ∨ false 
c  in DIMACS:
-5267 -5268 -5269  0

c i = 208
c  -2+1 --> -1
c    ( b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧  p_416) -> ( b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0)
c  in CNF:
c    -b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨  b^{2, 209}_2
c    -b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_1
c    -b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨  b^{2, 209}_0
c  in DIMACS:
-5270 -5271  5272 -416  5273 0
-5270 -5271  5272 -416 -5274 0
-5270 -5271  5272 -416  5275 0

c  -1+1 --> 0
c    ( b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0 ∧  p_416) -> (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧ -b^{2, 209}_0)
c  in CNF:
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_2
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_1
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_0
c  in DIMACS:
-5270  5271 -5272 -416 -5273 0
-5270  5271 -5272 -416 -5274 0
-5270  5271 -5272 -416 -5275 0

c  0+1 --> 1
c    (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧  p_416) -> (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0)
c  in CNF:
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_2
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_1
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨  b^{2, 209}_0
c  in DIMACS:
 5270  5271  5272 -416 -5273 0
 5270  5271  5272 -416 -5274 0
 5270  5271  5272 -416  5275 0

c  1+1 --> 2
c    (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0 ∧  p_416) -> (-b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0)
c  in CNF:
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_2
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨  b^{2, 209}_1
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ -p_416 ∨ -b^{2, 209}_0
c  in DIMACS:
 5270  5271 -5272 -416 -5273 0
 5270  5271 -5272 -416  5274 0
 5270  5271 -5272 -416 -5275 0

c  2+1 --> break 
c    (-b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧  p_416) -> break
c  in CNF:
c     b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 5270 -5271  5272 -416 1162 0


c  2-1 --> 1
c    (-b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧ -p_416) -> (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0)
c  in CNF:
c     b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_2
c     b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_1
c     b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨  b^{2, 209}_0
c  in DIMACS:
 5270 -5271  5272  416 -5273 0
 5270 -5271  5272  416 -5274 0
 5270 -5271  5272  416  5275 0

c  1-1 --> 0
c    (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0 ∧ -p_416) -> (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧ -b^{2, 209}_0)
c  in CNF:
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_2
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_1
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_0
c  in DIMACS:
 5270  5271 -5272  416 -5273 0
 5270  5271 -5272  416 -5274 0
 5270  5271 -5272  416 -5275 0

c  0-1 --> -1
c    (-b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧ -p_416) -> ( b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0)
c  in CNF:
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨  b^{2, 209}_2
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_1
c     b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨  b^{2, 209}_0
c  in DIMACS:
 5270  5271  5272  416  5273 0
 5270  5271  5272  416 -5274 0
 5270  5271  5272  416  5275 0

c  -1-1 --> -2
c    ( b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧  b^{2, 208}_0 ∧ -p_416) -> ( b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0)
c  in CNF:
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨  b^{2, 209}_2
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨  b^{2, 209}_1
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨  p_416 ∨ -b^{2, 209}_0
c  in DIMACS:
-5270  5271 -5272  416  5273 0
-5270  5271 -5272  416  5274 0
-5270  5271 -5272  416 -5275 0

c  -2-1 --> break 
c    ( b^{2, 208}_2 ∧  b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨  b^{2, 208}_0 ∨  p_416 ∨ break
c  in DIMACS:
-5270 -5271  5272  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 208}_2 ∧ -b^{2, 208}_1 ∧ -b^{2, 208}_0 ∧ true) 
c  in CNF:
c    -b^{2, 208}_2 ∨  b^{2, 208}_1 ∨  b^{2, 208}_0 ∨ false 
c  in DIMACS:
-5270  5271  5272  0

c  3 does not represent an automaton state.
c    -(-b^{2, 208}_2 ∧  b^{2, 208}_1 ∧  b^{2, 208}_0 ∧ true) 
c  in CNF:
c     b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ false 
c  in DIMACS:
 5270 -5271 -5272  0
c  -3 does not represent an automaton state.
c    -( b^{2, 208}_2 ∧  b^{2, 208}_1 ∧  b^{2, 208}_0 ∧ true) 
c  in CNF:
c    -b^{2, 208}_2 ∨ -b^{2, 208}_1 ∨ -b^{2, 208}_0 ∨ false 
c  in DIMACS:
-5270 -5271 -5272  0

c i = 209
c  -2+1 --> -1
c    ( b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧  p_418) -> ( b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0)
c  in CNF:
c    -b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨  b^{2, 210}_2
c    -b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_1
c    -b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨  b^{2, 210}_0
c  in DIMACS:
-5273 -5274  5275 -418  5276 0
-5273 -5274  5275 -418 -5277 0
-5273 -5274  5275 -418  5278 0

c  -1+1 --> 0
c    ( b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0 ∧  p_418) -> (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧ -b^{2, 210}_0)
c  in CNF:
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_2
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_1
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_0
c  in DIMACS:
-5273  5274 -5275 -418 -5276 0
-5273  5274 -5275 -418 -5277 0
-5273  5274 -5275 -418 -5278 0

c  0+1 --> 1
c    (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧  p_418) -> (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0)
c  in CNF:
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_2
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_1
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨  b^{2, 210}_0
c  in DIMACS:
 5273  5274  5275 -418 -5276 0
 5273  5274  5275 -418 -5277 0
 5273  5274  5275 -418  5278 0

c  1+1 --> 2
c    (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0 ∧  p_418) -> (-b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0)
c  in CNF:
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_2
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨  b^{2, 210}_1
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ -p_418 ∨ -b^{2, 210}_0
c  in DIMACS:
 5273  5274 -5275 -418 -5276 0
 5273  5274 -5275 -418  5277 0
 5273  5274 -5275 -418 -5278 0

c  2+1 --> break 
c    (-b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧  p_418) -> break
c  in CNF:
c     b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 5273 -5274  5275 -418 1162 0


c  2-1 --> 1
c    (-b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧ -p_418) -> (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0)
c  in CNF:
c     b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_2
c     b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_1
c     b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨  b^{2, 210}_0
c  in DIMACS:
 5273 -5274  5275  418 -5276 0
 5273 -5274  5275  418 -5277 0
 5273 -5274  5275  418  5278 0

c  1-1 --> 0
c    (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0 ∧ -p_418) -> (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧ -b^{2, 210}_0)
c  in CNF:
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_2
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_1
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_0
c  in DIMACS:
 5273  5274 -5275  418 -5276 0
 5273  5274 -5275  418 -5277 0
 5273  5274 -5275  418 -5278 0

c  0-1 --> -1
c    (-b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧ -p_418) -> ( b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0)
c  in CNF:
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨  b^{2, 210}_2
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_1
c     b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨  b^{2, 210}_0
c  in DIMACS:
 5273  5274  5275  418  5276 0
 5273  5274  5275  418 -5277 0
 5273  5274  5275  418  5278 0

c  -1-1 --> -2
c    ( b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧  b^{2, 209}_0 ∧ -p_418) -> ( b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0)
c  in CNF:
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨  b^{2, 210}_2
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨  b^{2, 210}_1
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨  p_418 ∨ -b^{2, 210}_0
c  in DIMACS:
-5273  5274 -5275  418  5276 0
-5273  5274 -5275  418  5277 0
-5273  5274 -5275  418 -5278 0

c  -2-1 --> break 
c    ( b^{2, 209}_2 ∧  b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨  b^{2, 209}_0 ∨  p_418 ∨ break
c  in DIMACS:
-5273 -5274  5275  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 209}_2 ∧ -b^{2, 209}_1 ∧ -b^{2, 209}_0 ∧ true) 
c  in CNF:
c    -b^{2, 209}_2 ∨  b^{2, 209}_1 ∨  b^{2, 209}_0 ∨ false 
c  in DIMACS:
-5273  5274  5275  0

c  3 does not represent an automaton state.
c    -(-b^{2, 209}_2 ∧  b^{2, 209}_1 ∧  b^{2, 209}_0 ∧ true) 
c  in CNF:
c     b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ false 
c  in DIMACS:
 5273 -5274 -5275  0
c  -3 does not represent an automaton state.
c    -( b^{2, 209}_2 ∧  b^{2, 209}_1 ∧  b^{2, 209}_0 ∧ true) 
c  in CNF:
c    -b^{2, 209}_2 ∨ -b^{2, 209}_1 ∨ -b^{2, 209}_0 ∨ false 
c  in DIMACS:
-5273 -5274 -5275  0

c i = 210
c  -2+1 --> -1
c    ( b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧  p_420) -> ( b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0)
c  in CNF:
c    -b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨  b^{2, 211}_2
c    -b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_1
c    -b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨  b^{2, 211}_0
c  in DIMACS:
-5276 -5277  5278 -420  5279 0
-5276 -5277  5278 -420 -5280 0
-5276 -5277  5278 -420  5281 0

c  -1+1 --> 0
c    ( b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0 ∧  p_420) -> (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧ -b^{2, 211}_0)
c  in CNF:
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_2
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_1
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_0
c  in DIMACS:
-5276  5277 -5278 -420 -5279 0
-5276  5277 -5278 -420 -5280 0
-5276  5277 -5278 -420 -5281 0

c  0+1 --> 1
c    (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧  p_420) -> (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0)
c  in CNF:
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_2
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_1
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨  b^{2, 211}_0
c  in DIMACS:
 5276  5277  5278 -420 -5279 0
 5276  5277  5278 -420 -5280 0
 5276  5277  5278 -420  5281 0

c  1+1 --> 2
c    (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0 ∧  p_420) -> (-b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0)
c  in CNF:
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_2
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨  b^{2, 211}_1
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ -p_420 ∨ -b^{2, 211}_0
c  in DIMACS:
 5276  5277 -5278 -420 -5279 0
 5276  5277 -5278 -420  5280 0
 5276  5277 -5278 -420 -5281 0

c  2+1 --> break 
c    (-b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧  p_420) -> break
c  in CNF:
c     b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 5276 -5277  5278 -420 1162 0


c  2-1 --> 1
c    (-b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧ -p_420) -> (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0)
c  in CNF:
c     b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_2
c     b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_1
c     b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨  b^{2, 211}_0
c  in DIMACS:
 5276 -5277  5278  420 -5279 0
 5276 -5277  5278  420 -5280 0
 5276 -5277  5278  420  5281 0

c  1-1 --> 0
c    (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0 ∧ -p_420) -> (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧ -b^{2, 211}_0)
c  in CNF:
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_2
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_1
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_0
c  in DIMACS:
 5276  5277 -5278  420 -5279 0
 5276  5277 -5278  420 -5280 0
 5276  5277 -5278  420 -5281 0

c  0-1 --> -1
c    (-b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧ -p_420) -> ( b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0)
c  in CNF:
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨  b^{2, 211}_2
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_1
c     b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨  b^{2, 211}_0
c  in DIMACS:
 5276  5277  5278  420  5279 0
 5276  5277  5278  420 -5280 0
 5276  5277  5278  420  5281 0

c  -1-1 --> -2
c    ( b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧  b^{2, 210}_0 ∧ -p_420) -> ( b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0)
c  in CNF:
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨  b^{2, 211}_2
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨  b^{2, 211}_1
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨  p_420 ∨ -b^{2, 211}_0
c  in DIMACS:
-5276  5277 -5278  420  5279 0
-5276  5277 -5278  420  5280 0
-5276  5277 -5278  420 -5281 0

c  -2-1 --> break 
c    ( b^{2, 210}_2 ∧  b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨  b^{2, 210}_0 ∨  p_420 ∨ break
c  in DIMACS:
-5276 -5277  5278  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 210}_2 ∧ -b^{2, 210}_1 ∧ -b^{2, 210}_0 ∧ true) 
c  in CNF:
c    -b^{2, 210}_2 ∨  b^{2, 210}_1 ∨  b^{2, 210}_0 ∨ false 
c  in DIMACS:
-5276  5277  5278  0

c  3 does not represent an automaton state.
c    -(-b^{2, 210}_2 ∧  b^{2, 210}_1 ∧  b^{2, 210}_0 ∧ true) 
c  in CNF:
c     b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ false 
c  in DIMACS:
 5276 -5277 -5278  0
c  -3 does not represent an automaton state.
c    -( b^{2, 210}_2 ∧  b^{2, 210}_1 ∧  b^{2, 210}_0 ∧ true) 
c  in CNF:
c    -b^{2, 210}_2 ∨ -b^{2, 210}_1 ∨ -b^{2, 210}_0 ∨ false 
c  in DIMACS:
-5276 -5277 -5278  0

c i = 211
c  -2+1 --> -1
c    ( b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧  p_422) -> ( b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0)
c  in CNF:
c    -b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨  b^{2, 212}_2
c    -b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_1
c    -b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨  b^{2, 212}_0
c  in DIMACS:
-5279 -5280  5281 -422  5282 0
-5279 -5280  5281 -422 -5283 0
-5279 -5280  5281 -422  5284 0

c  -1+1 --> 0
c    ( b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0 ∧  p_422) -> (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧ -b^{2, 212}_0)
c  in CNF:
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_2
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_1
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_0
c  in DIMACS:
-5279  5280 -5281 -422 -5282 0
-5279  5280 -5281 -422 -5283 0
-5279  5280 -5281 -422 -5284 0

c  0+1 --> 1
c    (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧  p_422) -> (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0)
c  in CNF:
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_2
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_1
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨  b^{2, 212}_0
c  in DIMACS:
 5279  5280  5281 -422 -5282 0
 5279  5280  5281 -422 -5283 0
 5279  5280  5281 -422  5284 0

c  1+1 --> 2
c    (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0 ∧  p_422) -> (-b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0)
c  in CNF:
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_2
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨  b^{2, 212}_1
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ -p_422 ∨ -b^{2, 212}_0
c  in DIMACS:
 5279  5280 -5281 -422 -5282 0
 5279  5280 -5281 -422  5283 0
 5279  5280 -5281 -422 -5284 0

c  2+1 --> break 
c    (-b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧  p_422) -> break
c  in CNF:
c     b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ -p_422 ∨ break
c  in DIMACS:
 5279 -5280  5281 -422 1162 0


c  2-1 --> 1
c    (-b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧ -p_422) -> (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0)
c  in CNF:
c     b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_2
c     b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_1
c     b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨  b^{2, 212}_0
c  in DIMACS:
 5279 -5280  5281  422 -5282 0
 5279 -5280  5281  422 -5283 0
 5279 -5280  5281  422  5284 0

c  1-1 --> 0
c    (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0 ∧ -p_422) -> (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧ -b^{2, 212}_0)
c  in CNF:
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_2
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_1
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_0
c  in DIMACS:
 5279  5280 -5281  422 -5282 0
 5279  5280 -5281  422 -5283 0
 5279  5280 -5281  422 -5284 0

c  0-1 --> -1
c    (-b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧ -p_422) -> ( b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0)
c  in CNF:
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨  b^{2, 212}_2
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_1
c     b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨  b^{2, 212}_0
c  in DIMACS:
 5279  5280  5281  422  5282 0
 5279  5280  5281  422 -5283 0
 5279  5280  5281  422  5284 0

c  -1-1 --> -2
c    ( b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧  b^{2, 211}_0 ∧ -p_422) -> ( b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0)
c  in CNF:
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨  b^{2, 212}_2
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨  b^{2, 212}_1
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨  p_422 ∨ -b^{2, 212}_0
c  in DIMACS:
-5279  5280 -5281  422  5282 0
-5279  5280 -5281  422  5283 0
-5279  5280 -5281  422 -5284 0

c  -2-1 --> break 
c    ( b^{2, 211}_2 ∧  b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧ -p_422) -> break
c  in CNF:
c    -b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨  b^{2, 211}_0 ∨  p_422 ∨ break
c  in DIMACS:
-5279 -5280  5281  422 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 211}_2 ∧ -b^{2, 211}_1 ∧ -b^{2, 211}_0 ∧ true) 
c  in CNF:
c    -b^{2, 211}_2 ∨  b^{2, 211}_1 ∨  b^{2, 211}_0 ∨ false 
c  in DIMACS:
-5279  5280  5281  0

c  3 does not represent an automaton state.
c    -(-b^{2, 211}_2 ∧  b^{2, 211}_1 ∧  b^{2, 211}_0 ∧ true) 
c  in CNF:
c     b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ false 
c  in DIMACS:
 5279 -5280 -5281  0
c  -3 does not represent an automaton state.
c    -( b^{2, 211}_2 ∧  b^{2, 211}_1 ∧  b^{2, 211}_0 ∧ true) 
c  in CNF:
c    -b^{2, 211}_2 ∨ -b^{2, 211}_1 ∨ -b^{2, 211}_0 ∨ false 
c  in DIMACS:
-5279 -5280 -5281  0

c i = 212
c  -2+1 --> -1
c    ( b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧  p_424) -> ( b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0)
c  in CNF:
c    -b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨  b^{2, 213}_2
c    -b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_1
c    -b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨  b^{2, 213}_0
c  in DIMACS:
-5282 -5283  5284 -424  5285 0
-5282 -5283  5284 -424 -5286 0
-5282 -5283  5284 -424  5287 0

c  -1+1 --> 0
c    ( b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0 ∧  p_424) -> (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧ -b^{2, 213}_0)
c  in CNF:
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_2
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_1
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_0
c  in DIMACS:
-5282  5283 -5284 -424 -5285 0
-5282  5283 -5284 -424 -5286 0
-5282  5283 -5284 -424 -5287 0

c  0+1 --> 1
c    (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧  p_424) -> (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0)
c  in CNF:
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_2
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_1
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨  b^{2, 213}_0
c  in DIMACS:
 5282  5283  5284 -424 -5285 0
 5282  5283  5284 -424 -5286 0
 5282  5283  5284 -424  5287 0

c  1+1 --> 2
c    (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0 ∧  p_424) -> (-b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0)
c  in CNF:
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_2
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨  b^{2, 213}_1
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ -p_424 ∨ -b^{2, 213}_0
c  in DIMACS:
 5282  5283 -5284 -424 -5285 0
 5282  5283 -5284 -424  5286 0
 5282  5283 -5284 -424 -5287 0

c  2+1 --> break 
c    (-b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧  p_424) -> break
c  in CNF:
c     b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 5282 -5283  5284 -424 1162 0


c  2-1 --> 1
c    (-b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧ -p_424) -> (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0)
c  in CNF:
c     b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_2
c     b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_1
c     b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨  b^{2, 213}_0
c  in DIMACS:
 5282 -5283  5284  424 -5285 0
 5282 -5283  5284  424 -5286 0
 5282 -5283  5284  424  5287 0

c  1-1 --> 0
c    (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0 ∧ -p_424) -> (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧ -b^{2, 213}_0)
c  in CNF:
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_2
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_1
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_0
c  in DIMACS:
 5282  5283 -5284  424 -5285 0
 5282  5283 -5284  424 -5286 0
 5282  5283 -5284  424 -5287 0

c  0-1 --> -1
c    (-b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧ -p_424) -> ( b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0)
c  in CNF:
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨  b^{2, 213}_2
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_1
c     b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨  b^{2, 213}_0
c  in DIMACS:
 5282  5283  5284  424  5285 0
 5282  5283  5284  424 -5286 0
 5282  5283  5284  424  5287 0

c  -1-1 --> -2
c    ( b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧  b^{2, 212}_0 ∧ -p_424) -> ( b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0)
c  in CNF:
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨  b^{2, 213}_2
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨  b^{2, 213}_1
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨  p_424 ∨ -b^{2, 213}_0
c  in DIMACS:
-5282  5283 -5284  424  5285 0
-5282  5283 -5284  424  5286 0
-5282  5283 -5284  424 -5287 0

c  -2-1 --> break 
c    ( b^{2, 212}_2 ∧  b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨  b^{2, 212}_0 ∨  p_424 ∨ break
c  in DIMACS:
-5282 -5283  5284  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 212}_2 ∧ -b^{2, 212}_1 ∧ -b^{2, 212}_0 ∧ true) 
c  in CNF:
c    -b^{2, 212}_2 ∨  b^{2, 212}_1 ∨  b^{2, 212}_0 ∨ false 
c  in DIMACS:
-5282  5283  5284  0

c  3 does not represent an automaton state.
c    -(-b^{2, 212}_2 ∧  b^{2, 212}_1 ∧  b^{2, 212}_0 ∧ true) 
c  in CNF:
c     b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ false 
c  in DIMACS:
 5282 -5283 -5284  0
c  -3 does not represent an automaton state.
c    -( b^{2, 212}_2 ∧  b^{2, 212}_1 ∧  b^{2, 212}_0 ∧ true) 
c  in CNF:
c    -b^{2, 212}_2 ∨ -b^{2, 212}_1 ∨ -b^{2, 212}_0 ∨ false 
c  in DIMACS:
-5282 -5283 -5284  0

c i = 213
c  -2+1 --> -1
c    ( b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧  p_426) -> ( b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0)
c  in CNF:
c    -b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨  b^{2, 214}_2
c    -b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_1
c    -b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨  b^{2, 214}_0
c  in DIMACS:
-5285 -5286  5287 -426  5288 0
-5285 -5286  5287 -426 -5289 0
-5285 -5286  5287 -426  5290 0

c  -1+1 --> 0
c    ( b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0 ∧  p_426) -> (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧ -b^{2, 214}_0)
c  in CNF:
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_2
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_1
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_0
c  in DIMACS:
-5285  5286 -5287 -426 -5288 0
-5285  5286 -5287 -426 -5289 0
-5285  5286 -5287 -426 -5290 0

c  0+1 --> 1
c    (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧  p_426) -> (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0)
c  in CNF:
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_2
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_1
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨  b^{2, 214}_0
c  in DIMACS:
 5285  5286  5287 -426 -5288 0
 5285  5286  5287 -426 -5289 0
 5285  5286  5287 -426  5290 0

c  1+1 --> 2
c    (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0 ∧  p_426) -> (-b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0)
c  in CNF:
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_2
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨  b^{2, 214}_1
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ -p_426 ∨ -b^{2, 214}_0
c  in DIMACS:
 5285  5286 -5287 -426 -5288 0
 5285  5286 -5287 -426  5289 0
 5285  5286 -5287 -426 -5290 0

c  2+1 --> break 
c    (-b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧  p_426) -> break
c  in CNF:
c     b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 5285 -5286  5287 -426 1162 0


c  2-1 --> 1
c    (-b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧ -p_426) -> (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0)
c  in CNF:
c     b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_2
c     b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_1
c     b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨  b^{2, 214}_0
c  in DIMACS:
 5285 -5286  5287  426 -5288 0
 5285 -5286  5287  426 -5289 0
 5285 -5286  5287  426  5290 0

c  1-1 --> 0
c    (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0 ∧ -p_426) -> (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧ -b^{2, 214}_0)
c  in CNF:
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_2
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_1
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_0
c  in DIMACS:
 5285  5286 -5287  426 -5288 0
 5285  5286 -5287  426 -5289 0
 5285  5286 -5287  426 -5290 0

c  0-1 --> -1
c    (-b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧ -p_426) -> ( b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0)
c  in CNF:
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨  b^{2, 214}_2
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_1
c     b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨  b^{2, 214}_0
c  in DIMACS:
 5285  5286  5287  426  5288 0
 5285  5286  5287  426 -5289 0
 5285  5286  5287  426  5290 0

c  -1-1 --> -2
c    ( b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧  b^{2, 213}_0 ∧ -p_426) -> ( b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0)
c  in CNF:
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨  b^{2, 214}_2
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨  b^{2, 214}_1
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨  p_426 ∨ -b^{2, 214}_0
c  in DIMACS:
-5285  5286 -5287  426  5288 0
-5285  5286 -5287  426  5289 0
-5285  5286 -5287  426 -5290 0

c  -2-1 --> break 
c    ( b^{2, 213}_2 ∧  b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨  b^{2, 213}_0 ∨  p_426 ∨ break
c  in DIMACS:
-5285 -5286  5287  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 213}_2 ∧ -b^{2, 213}_1 ∧ -b^{2, 213}_0 ∧ true) 
c  in CNF:
c    -b^{2, 213}_2 ∨  b^{2, 213}_1 ∨  b^{2, 213}_0 ∨ false 
c  in DIMACS:
-5285  5286  5287  0

c  3 does not represent an automaton state.
c    -(-b^{2, 213}_2 ∧  b^{2, 213}_1 ∧  b^{2, 213}_0 ∧ true) 
c  in CNF:
c     b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ false 
c  in DIMACS:
 5285 -5286 -5287  0
c  -3 does not represent an automaton state.
c    -( b^{2, 213}_2 ∧  b^{2, 213}_1 ∧  b^{2, 213}_0 ∧ true) 
c  in CNF:
c    -b^{2, 213}_2 ∨ -b^{2, 213}_1 ∨ -b^{2, 213}_0 ∨ false 
c  in DIMACS:
-5285 -5286 -5287  0

c i = 214
c  -2+1 --> -1
c    ( b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧  p_428) -> ( b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0)
c  in CNF:
c    -b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨  b^{2, 215}_2
c    -b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_1
c    -b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨  b^{2, 215}_0
c  in DIMACS:
-5288 -5289  5290 -428  5291 0
-5288 -5289  5290 -428 -5292 0
-5288 -5289  5290 -428  5293 0

c  -1+1 --> 0
c    ( b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0 ∧  p_428) -> (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧ -b^{2, 215}_0)
c  in CNF:
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_2
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_1
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_0
c  in DIMACS:
-5288  5289 -5290 -428 -5291 0
-5288  5289 -5290 -428 -5292 0
-5288  5289 -5290 -428 -5293 0

c  0+1 --> 1
c    (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧  p_428) -> (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0)
c  in CNF:
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_2
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_1
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨  b^{2, 215}_0
c  in DIMACS:
 5288  5289  5290 -428 -5291 0
 5288  5289  5290 -428 -5292 0
 5288  5289  5290 -428  5293 0

c  1+1 --> 2
c    (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0 ∧  p_428) -> (-b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0)
c  in CNF:
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_2
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨  b^{2, 215}_1
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ -p_428 ∨ -b^{2, 215}_0
c  in DIMACS:
 5288  5289 -5290 -428 -5291 0
 5288  5289 -5290 -428  5292 0
 5288  5289 -5290 -428 -5293 0

c  2+1 --> break 
c    (-b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧  p_428) -> break
c  in CNF:
c     b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ -p_428 ∨ break
c  in DIMACS:
 5288 -5289  5290 -428 1162 0


c  2-1 --> 1
c    (-b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧ -p_428) -> (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0)
c  in CNF:
c     b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_2
c     b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_1
c     b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨  b^{2, 215}_0
c  in DIMACS:
 5288 -5289  5290  428 -5291 0
 5288 -5289  5290  428 -5292 0
 5288 -5289  5290  428  5293 0

c  1-1 --> 0
c    (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0 ∧ -p_428) -> (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧ -b^{2, 215}_0)
c  in CNF:
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_2
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_1
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_0
c  in DIMACS:
 5288  5289 -5290  428 -5291 0
 5288  5289 -5290  428 -5292 0
 5288  5289 -5290  428 -5293 0

c  0-1 --> -1
c    (-b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧ -p_428) -> ( b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0)
c  in CNF:
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨  b^{2, 215}_2
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_1
c     b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨  b^{2, 215}_0
c  in DIMACS:
 5288  5289  5290  428  5291 0
 5288  5289  5290  428 -5292 0
 5288  5289  5290  428  5293 0

c  -1-1 --> -2
c    ( b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧  b^{2, 214}_0 ∧ -p_428) -> ( b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0)
c  in CNF:
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨  b^{2, 215}_2
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨  b^{2, 215}_1
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨  p_428 ∨ -b^{2, 215}_0
c  in DIMACS:
-5288  5289 -5290  428  5291 0
-5288  5289 -5290  428  5292 0
-5288  5289 -5290  428 -5293 0

c  -2-1 --> break 
c    ( b^{2, 214}_2 ∧  b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧ -p_428) -> break
c  in CNF:
c    -b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨  b^{2, 214}_0 ∨  p_428 ∨ break
c  in DIMACS:
-5288 -5289  5290  428 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 214}_2 ∧ -b^{2, 214}_1 ∧ -b^{2, 214}_0 ∧ true) 
c  in CNF:
c    -b^{2, 214}_2 ∨  b^{2, 214}_1 ∨  b^{2, 214}_0 ∨ false 
c  in DIMACS:
-5288  5289  5290  0

c  3 does not represent an automaton state.
c    -(-b^{2, 214}_2 ∧  b^{2, 214}_1 ∧  b^{2, 214}_0 ∧ true) 
c  in CNF:
c     b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ false 
c  in DIMACS:
 5288 -5289 -5290  0
c  -3 does not represent an automaton state.
c    -( b^{2, 214}_2 ∧  b^{2, 214}_1 ∧  b^{2, 214}_0 ∧ true) 
c  in CNF:
c    -b^{2, 214}_2 ∨ -b^{2, 214}_1 ∨ -b^{2, 214}_0 ∨ false 
c  in DIMACS:
-5288 -5289 -5290  0

c i = 215
c  -2+1 --> -1
c    ( b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧  p_430) -> ( b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0)
c  in CNF:
c    -b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨  b^{2, 216}_2
c    -b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_1
c    -b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨  b^{2, 216}_0
c  in DIMACS:
-5291 -5292  5293 -430  5294 0
-5291 -5292  5293 -430 -5295 0
-5291 -5292  5293 -430  5296 0

c  -1+1 --> 0
c    ( b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0 ∧  p_430) -> (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧ -b^{2, 216}_0)
c  in CNF:
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_2
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_1
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_0
c  in DIMACS:
-5291  5292 -5293 -430 -5294 0
-5291  5292 -5293 -430 -5295 0
-5291  5292 -5293 -430 -5296 0

c  0+1 --> 1
c    (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧  p_430) -> (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0)
c  in CNF:
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_2
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_1
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨  b^{2, 216}_0
c  in DIMACS:
 5291  5292  5293 -430 -5294 0
 5291  5292  5293 -430 -5295 0
 5291  5292  5293 -430  5296 0

c  1+1 --> 2
c    (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0 ∧  p_430) -> (-b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0)
c  in CNF:
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_2
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨  b^{2, 216}_1
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ -p_430 ∨ -b^{2, 216}_0
c  in DIMACS:
 5291  5292 -5293 -430 -5294 0
 5291  5292 -5293 -430  5295 0
 5291  5292 -5293 -430 -5296 0

c  2+1 --> break 
c    (-b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧  p_430) -> break
c  in CNF:
c     b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 5291 -5292  5293 -430 1162 0


c  2-1 --> 1
c    (-b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧ -p_430) -> (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0)
c  in CNF:
c     b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_2
c     b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_1
c     b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨  b^{2, 216}_0
c  in DIMACS:
 5291 -5292  5293  430 -5294 0
 5291 -5292  5293  430 -5295 0
 5291 -5292  5293  430  5296 0

c  1-1 --> 0
c    (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0 ∧ -p_430) -> (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧ -b^{2, 216}_0)
c  in CNF:
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_2
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_1
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_0
c  in DIMACS:
 5291  5292 -5293  430 -5294 0
 5291  5292 -5293  430 -5295 0
 5291  5292 -5293  430 -5296 0

c  0-1 --> -1
c    (-b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧ -p_430) -> ( b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0)
c  in CNF:
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨  b^{2, 216}_2
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_1
c     b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨  b^{2, 216}_0
c  in DIMACS:
 5291  5292  5293  430  5294 0
 5291  5292  5293  430 -5295 0
 5291  5292  5293  430  5296 0

c  -1-1 --> -2
c    ( b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧  b^{2, 215}_0 ∧ -p_430) -> ( b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0)
c  in CNF:
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨  b^{2, 216}_2
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨  b^{2, 216}_1
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨  p_430 ∨ -b^{2, 216}_0
c  in DIMACS:
-5291  5292 -5293  430  5294 0
-5291  5292 -5293  430  5295 0
-5291  5292 -5293  430 -5296 0

c  -2-1 --> break 
c    ( b^{2, 215}_2 ∧  b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨  b^{2, 215}_0 ∨  p_430 ∨ break
c  in DIMACS:
-5291 -5292  5293  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 215}_2 ∧ -b^{2, 215}_1 ∧ -b^{2, 215}_0 ∧ true) 
c  in CNF:
c    -b^{2, 215}_2 ∨  b^{2, 215}_1 ∨  b^{2, 215}_0 ∨ false 
c  in DIMACS:
-5291  5292  5293  0

c  3 does not represent an automaton state.
c    -(-b^{2, 215}_2 ∧  b^{2, 215}_1 ∧  b^{2, 215}_0 ∧ true) 
c  in CNF:
c     b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ false 
c  in DIMACS:
 5291 -5292 -5293  0
c  -3 does not represent an automaton state.
c    -( b^{2, 215}_2 ∧  b^{2, 215}_1 ∧  b^{2, 215}_0 ∧ true) 
c  in CNF:
c    -b^{2, 215}_2 ∨ -b^{2, 215}_1 ∨ -b^{2, 215}_0 ∨ false 
c  in DIMACS:
-5291 -5292 -5293  0

c i = 216
c  -2+1 --> -1
c    ( b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧  p_432) -> ( b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0)
c  in CNF:
c    -b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨  b^{2, 217}_2
c    -b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_1
c    -b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨  b^{2, 217}_0
c  in DIMACS:
-5294 -5295  5296 -432  5297 0
-5294 -5295  5296 -432 -5298 0
-5294 -5295  5296 -432  5299 0

c  -1+1 --> 0
c    ( b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0 ∧  p_432) -> (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧ -b^{2, 217}_0)
c  in CNF:
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_2
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_1
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_0
c  in DIMACS:
-5294  5295 -5296 -432 -5297 0
-5294  5295 -5296 -432 -5298 0
-5294  5295 -5296 -432 -5299 0

c  0+1 --> 1
c    (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧  p_432) -> (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0)
c  in CNF:
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_2
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_1
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨  b^{2, 217}_0
c  in DIMACS:
 5294  5295  5296 -432 -5297 0
 5294  5295  5296 -432 -5298 0
 5294  5295  5296 -432  5299 0

c  1+1 --> 2
c    (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0 ∧  p_432) -> (-b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0)
c  in CNF:
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_2
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨  b^{2, 217}_1
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ -p_432 ∨ -b^{2, 217}_0
c  in DIMACS:
 5294  5295 -5296 -432 -5297 0
 5294  5295 -5296 -432  5298 0
 5294  5295 -5296 -432 -5299 0

c  2+1 --> break 
c    (-b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧  p_432) -> break
c  in CNF:
c     b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 5294 -5295  5296 -432 1162 0


c  2-1 --> 1
c    (-b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧ -p_432) -> (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0)
c  in CNF:
c     b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_2
c     b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_1
c     b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨  b^{2, 217}_0
c  in DIMACS:
 5294 -5295  5296  432 -5297 0
 5294 -5295  5296  432 -5298 0
 5294 -5295  5296  432  5299 0

c  1-1 --> 0
c    (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0 ∧ -p_432) -> (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧ -b^{2, 217}_0)
c  in CNF:
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_2
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_1
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_0
c  in DIMACS:
 5294  5295 -5296  432 -5297 0
 5294  5295 -5296  432 -5298 0
 5294  5295 -5296  432 -5299 0

c  0-1 --> -1
c    (-b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧ -p_432) -> ( b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0)
c  in CNF:
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨  b^{2, 217}_2
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_1
c     b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨  b^{2, 217}_0
c  in DIMACS:
 5294  5295  5296  432  5297 0
 5294  5295  5296  432 -5298 0
 5294  5295  5296  432  5299 0

c  -1-1 --> -2
c    ( b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧  b^{2, 216}_0 ∧ -p_432) -> ( b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0)
c  in CNF:
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨  b^{2, 217}_2
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨  b^{2, 217}_1
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨  p_432 ∨ -b^{2, 217}_0
c  in DIMACS:
-5294  5295 -5296  432  5297 0
-5294  5295 -5296  432  5298 0
-5294  5295 -5296  432 -5299 0

c  -2-1 --> break 
c    ( b^{2, 216}_2 ∧  b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨  b^{2, 216}_0 ∨  p_432 ∨ break
c  in DIMACS:
-5294 -5295  5296  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 216}_2 ∧ -b^{2, 216}_1 ∧ -b^{2, 216}_0 ∧ true) 
c  in CNF:
c    -b^{2, 216}_2 ∨  b^{2, 216}_1 ∨  b^{2, 216}_0 ∨ false 
c  in DIMACS:
-5294  5295  5296  0

c  3 does not represent an automaton state.
c    -(-b^{2, 216}_2 ∧  b^{2, 216}_1 ∧  b^{2, 216}_0 ∧ true) 
c  in CNF:
c     b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ false 
c  in DIMACS:
 5294 -5295 -5296  0
c  -3 does not represent an automaton state.
c    -( b^{2, 216}_2 ∧  b^{2, 216}_1 ∧  b^{2, 216}_0 ∧ true) 
c  in CNF:
c    -b^{2, 216}_2 ∨ -b^{2, 216}_1 ∨ -b^{2, 216}_0 ∨ false 
c  in DIMACS:
-5294 -5295 -5296  0

c i = 217
c  -2+1 --> -1
c    ( b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧  p_434) -> ( b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0)
c  in CNF:
c    -b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨  b^{2, 218}_2
c    -b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_1
c    -b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨  b^{2, 218}_0
c  in DIMACS:
-5297 -5298  5299 -434  5300 0
-5297 -5298  5299 -434 -5301 0
-5297 -5298  5299 -434  5302 0

c  -1+1 --> 0
c    ( b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0 ∧  p_434) -> (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧ -b^{2, 218}_0)
c  in CNF:
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_2
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_1
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_0
c  in DIMACS:
-5297  5298 -5299 -434 -5300 0
-5297  5298 -5299 -434 -5301 0
-5297  5298 -5299 -434 -5302 0

c  0+1 --> 1
c    (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧  p_434) -> (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0)
c  in CNF:
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_2
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_1
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨  b^{2, 218}_0
c  in DIMACS:
 5297  5298  5299 -434 -5300 0
 5297  5298  5299 -434 -5301 0
 5297  5298  5299 -434  5302 0

c  1+1 --> 2
c    (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0 ∧  p_434) -> (-b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0)
c  in CNF:
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_2
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨  b^{2, 218}_1
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ -p_434 ∨ -b^{2, 218}_0
c  in DIMACS:
 5297  5298 -5299 -434 -5300 0
 5297  5298 -5299 -434  5301 0
 5297  5298 -5299 -434 -5302 0

c  2+1 --> break 
c    (-b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧  p_434) -> break
c  in CNF:
c     b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 5297 -5298  5299 -434 1162 0


c  2-1 --> 1
c    (-b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧ -p_434) -> (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0)
c  in CNF:
c     b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_2
c     b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_1
c     b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨  b^{2, 218}_0
c  in DIMACS:
 5297 -5298  5299  434 -5300 0
 5297 -5298  5299  434 -5301 0
 5297 -5298  5299  434  5302 0

c  1-1 --> 0
c    (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0 ∧ -p_434) -> (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧ -b^{2, 218}_0)
c  in CNF:
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_2
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_1
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_0
c  in DIMACS:
 5297  5298 -5299  434 -5300 0
 5297  5298 -5299  434 -5301 0
 5297  5298 -5299  434 -5302 0

c  0-1 --> -1
c    (-b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧ -p_434) -> ( b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0)
c  in CNF:
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨  b^{2, 218}_2
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_1
c     b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨  b^{2, 218}_0
c  in DIMACS:
 5297  5298  5299  434  5300 0
 5297  5298  5299  434 -5301 0
 5297  5298  5299  434  5302 0

c  -1-1 --> -2
c    ( b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧  b^{2, 217}_0 ∧ -p_434) -> ( b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0)
c  in CNF:
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨  b^{2, 218}_2
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨  b^{2, 218}_1
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨  p_434 ∨ -b^{2, 218}_0
c  in DIMACS:
-5297  5298 -5299  434  5300 0
-5297  5298 -5299  434  5301 0
-5297  5298 -5299  434 -5302 0

c  -2-1 --> break 
c    ( b^{2, 217}_2 ∧  b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨  b^{2, 217}_0 ∨  p_434 ∨ break
c  in DIMACS:
-5297 -5298  5299  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 217}_2 ∧ -b^{2, 217}_1 ∧ -b^{2, 217}_0 ∧ true) 
c  in CNF:
c    -b^{2, 217}_2 ∨  b^{2, 217}_1 ∨  b^{2, 217}_0 ∨ false 
c  in DIMACS:
-5297  5298  5299  0

c  3 does not represent an automaton state.
c    -(-b^{2, 217}_2 ∧  b^{2, 217}_1 ∧  b^{2, 217}_0 ∧ true) 
c  in CNF:
c     b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ false 
c  in DIMACS:
 5297 -5298 -5299  0
c  -3 does not represent an automaton state.
c    -( b^{2, 217}_2 ∧  b^{2, 217}_1 ∧  b^{2, 217}_0 ∧ true) 
c  in CNF:
c    -b^{2, 217}_2 ∨ -b^{2, 217}_1 ∨ -b^{2, 217}_0 ∨ false 
c  in DIMACS:
-5297 -5298 -5299  0

c i = 218
c  -2+1 --> -1
c    ( b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧  p_436) -> ( b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0)
c  in CNF:
c    -b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨  b^{2, 219}_2
c    -b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_1
c    -b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨  b^{2, 219}_0
c  in DIMACS:
-5300 -5301  5302 -436  5303 0
-5300 -5301  5302 -436 -5304 0
-5300 -5301  5302 -436  5305 0

c  -1+1 --> 0
c    ( b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0 ∧  p_436) -> (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧ -b^{2, 219}_0)
c  in CNF:
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_2
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_1
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_0
c  in DIMACS:
-5300  5301 -5302 -436 -5303 0
-5300  5301 -5302 -436 -5304 0
-5300  5301 -5302 -436 -5305 0

c  0+1 --> 1
c    (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧  p_436) -> (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0)
c  in CNF:
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_2
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_1
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨  b^{2, 219}_0
c  in DIMACS:
 5300  5301  5302 -436 -5303 0
 5300  5301  5302 -436 -5304 0
 5300  5301  5302 -436  5305 0

c  1+1 --> 2
c    (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0 ∧  p_436) -> (-b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0)
c  in CNF:
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_2
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨  b^{2, 219}_1
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ -p_436 ∨ -b^{2, 219}_0
c  in DIMACS:
 5300  5301 -5302 -436 -5303 0
 5300  5301 -5302 -436  5304 0
 5300  5301 -5302 -436 -5305 0

c  2+1 --> break 
c    (-b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧  p_436) -> break
c  in CNF:
c     b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ -p_436 ∨ break
c  in DIMACS:
 5300 -5301  5302 -436 1162 0


c  2-1 --> 1
c    (-b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧ -p_436) -> (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0)
c  in CNF:
c     b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_2
c     b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_1
c     b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨  b^{2, 219}_0
c  in DIMACS:
 5300 -5301  5302  436 -5303 0
 5300 -5301  5302  436 -5304 0
 5300 -5301  5302  436  5305 0

c  1-1 --> 0
c    (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0 ∧ -p_436) -> (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧ -b^{2, 219}_0)
c  in CNF:
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_2
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_1
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_0
c  in DIMACS:
 5300  5301 -5302  436 -5303 0
 5300  5301 -5302  436 -5304 0
 5300  5301 -5302  436 -5305 0

c  0-1 --> -1
c    (-b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧ -p_436) -> ( b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0)
c  in CNF:
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨  b^{2, 219}_2
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_1
c     b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨  b^{2, 219}_0
c  in DIMACS:
 5300  5301  5302  436  5303 0
 5300  5301  5302  436 -5304 0
 5300  5301  5302  436  5305 0

c  -1-1 --> -2
c    ( b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧  b^{2, 218}_0 ∧ -p_436) -> ( b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0)
c  in CNF:
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨  b^{2, 219}_2
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨  b^{2, 219}_1
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨  p_436 ∨ -b^{2, 219}_0
c  in DIMACS:
-5300  5301 -5302  436  5303 0
-5300  5301 -5302  436  5304 0
-5300  5301 -5302  436 -5305 0

c  -2-1 --> break 
c    ( b^{2, 218}_2 ∧  b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧ -p_436) -> break
c  in CNF:
c    -b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨  b^{2, 218}_0 ∨  p_436 ∨ break
c  in DIMACS:
-5300 -5301  5302  436 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 218}_2 ∧ -b^{2, 218}_1 ∧ -b^{2, 218}_0 ∧ true) 
c  in CNF:
c    -b^{2, 218}_2 ∨  b^{2, 218}_1 ∨  b^{2, 218}_0 ∨ false 
c  in DIMACS:
-5300  5301  5302  0

c  3 does not represent an automaton state.
c    -(-b^{2, 218}_2 ∧  b^{2, 218}_1 ∧  b^{2, 218}_0 ∧ true) 
c  in CNF:
c     b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ false 
c  in DIMACS:
 5300 -5301 -5302  0
c  -3 does not represent an automaton state.
c    -( b^{2, 218}_2 ∧  b^{2, 218}_1 ∧  b^{2, 218}_0 ∧ true) 
c  in CNF:
c    -b^{2, 218}_2 ∨ -b^{2, 218}_1 ∨ -b^{2, 218}_0 ∨ false 
c  in DIMACS:
-5300 -5301 -5302  0

c i = 219
c  -2+1 --> -1
c    ( b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧  p_438) -> ( b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0)
c  in CNF:
c    -b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨  b^{2, 220}_2
c    -b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_1
c    -b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨  b^{2, 220}_0
c  in DIMACS:
-5303 -5304  5305 -438  5306 0
-5303 -5304  5305 -438 -5307 0
-5303 -5304  5305 -438  5308 0

c  -1+1 --> 0
c    ( b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0 ∧  p_438) -> (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧ -b^{2, 220}_0)
c  in CNF:
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_2
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_1
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_0
c  in DIMACS:
-5303  5304 -5305 -438 -5306 0
-5303  5304 -5305 -438 -5307 0
-5303  5304 -5305 -438 -5308 0

c  0+1 --> 1
c    (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧  p_438) -> (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0)
c  in CNF:
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_2
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_1
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨  b^{2, 220}_0
c  in DIMACS:
 5303  5304  5305 -438 -5306 0
 5303  5304  5305 -438 -5307 0
 5303  5304  5305 -438  5308 0

c  1+1 --> 2
c    (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0 ∧  p_438) -> (-b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0)
c  in CNF:
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_2
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨  b^{2, 220}_1
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ -p_438 ∨ -b^{2, 220}_0
c  in DIMACS:
 5303  5304 -5305 -438 -5306 0
 5303  5304 -5305 -438  5307 0
 5303  5304 -5305 -438 -5308 0

c  2+1 --> break 
c    (-b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧  p_438) -> break
c  in CNF:
c     b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 5303 -5304  5305 -438 1162 0


c  2-1 --> 1
c    (-b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧ -p_438) -> (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0)
c  in CNF:
c     b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_2
c     b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_1
c     b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨  b^{2, 220}_0
c  in DIMACS:
 5303 -5304  5305  438 -5306 0
 5303 -5304  5305  438 -5307 0
 5303 -5304  5305  438  5308 0

c  1-1 --> 0
c    (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0 ∧ -p_438) -> (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧ -b^{2, 220}_0)
c  in CNF:
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_2
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_1
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_0
c  in DIMACS:
 5303  5304 -5305  438 -5306 0
 5303  5304 -5305  438 -5307 0
 5303  5304 -5305  438 -5308 0

c  0-1 --> -1
c    (-b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧ -p_438) -> ( b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0)
c  in CNF:
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨  b^{2, 220}_2
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_1
c     b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨  b^{2, 220}_0
c  in DIMACS:
 5303  5304  5305  438  5306 0
 5303  5304  5305  438 -5307 0
 5303  5304  5305  438  5308 0

c  -1-1 --> -2
c    ( b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧  b^{2, 219}_0 ∧ -p_438) -> ( b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0)
c  in CNF:
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨  b^{2, 220}_2
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨  b^{2, 220}_1
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨  p_438 ∨ -b^{2, 220}_0
c  in DIMACS:
-5303  5304 -5305  438  5306 0
-5303  5304 -5305  438  5307 0
-5303  5304 -5305  438 -5308 0

c  -2-1 --> break 
c    ( b^{2, 219}_2 ∧  b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨  b^{2, 219}_0 ∨  p_438 ∨ break
c  in DIMACS:
-5303 -5304  5305  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 219}_2 ∧ -b^{2, 219}_1 ∧ -b^{2, 219}_0 ∧ true) 
c  in CNF:
c    -b^{2, 219}_2 ∨  b^{2, 219}_1 ∨  b^{2, 219}_0 ∨ false 
c  in DIMACS:
-5303  5304  5305  0

c  3 does not represent an automaton state.
c    -(-b^{2, 219}_2 ∧  b^{2, 219}_1 ∧  b^{2, 219}_0 ∧ true) 
c  in CNF:
c     b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ false 
c  in DIMACS:
 5303 -5304 -5305  0
c  -3 does not represent an automaton state.
c    -( b^{2, 219}_2 ∧  b^{2, 219}_1 ∧  b^{2, 219}_0 ∧ true) 
c  in CNF:
c    -b^{2, 219}_2 ∨ -b^{2, 219}_1 ∨ -b^{2, 219}_0 ∨ false 
c  in DIMACS:
-5303 -5304 -5305  0

c i = 220
c  -2+1 --> -1
c    ( b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧  p_440) -> ( b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0)
c  in CNF:
c    -b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨  b^{2, 221}_2
c    -b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_1
c    -b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨  b^{2, 221}_0
c  in DIMACS:
-5306 -5307  5308 -440  5309 0
-5306 -5307  5308 -440 -5310 0
-5306 -5307  5308 -440  5311 0

c  -1+1 --> 0
c    ( b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0 ∧  p_440) -> (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧ -b^{2, 221}_0)
c  in CNF:
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_2
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_1
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_0
c  in DIMACS:
-5306  5307 -5308 -440 -5309 0
-5306  5307 -5308 -440 -5310 0
-5306  5307 -5308 -440 -5311 0

c  0+1 --> 1
c    (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧  p_440) -> (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0)
c  in CNF:
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_2
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_1
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨  b^{2, 221}_0
c  in DIMACS:
 5306  5307  5308 -440 -5309 0
 5306  5307  5308 -440 -5310 0
 5306  5307  5308 -440  5311 0

c  1+1 --> 2
c    (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0 ∧  p_440) -> (-b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0)
c  in CNF:
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_2
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨  b^{2, 221}_1
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ -p_440 ∨ -b^{2, 221}_0
c  in DIMACS:
 5306  5307 -5308 -440 -5309 0
 5306  5307 -5308 -440  5310 0
 5306  5307 -5308 -440 -5311 0

c  2+1 --> break 
c    (-b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧  p_440) -> break
c  in CNF:
c     b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 5306 -5307  5308 -440 1162 0


c  2-1 --> 1
c    (-b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧ -p_440) -> (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0)
c  in CNF:
c     b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_2
c     b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_1
c     b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨  b^{2, 221}_0
c  in DIMACS:
 5306 -5307  5308  440 -5309 0
 5306 -5307  5308  440 -5310 0
 5306 -5307  5308  440  5311 0

c  1-1 --> 0
c    (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0 ∧ -p_440) -> (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧ -b^{2, 221}_0)
c  in CNF:
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_2
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_1
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_0
c  in DIMACS:
 5306  5307 -5308  440 -5309 0
 5306  5307 -5308  440 -5310 0
 5306  5307 -5308  440 -5311 0

c  0-1 --> -1
c    (-b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧ -p_440) -> ( b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0)
c  in CNF:
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨  b^{2, 221}_2
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_1
c     b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨  b^{2, 221}_0
c  in DIMACS:
 5306  5307  5308  440  5309 0
 5306  5307  5308  440 -5310 0
 5306  5307  5308  440  5311 0

c  -1-1 --> -2
c    ( b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧  b^{2, 220}_0 ∧ -p_440) -> ( b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0)
c  in CNF:
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨  b^{2, 221}_2
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨  b^{2, 221}_1
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨  p_440 ∨ -b^{2, 221}_0
c  in DIMACS:
-5306  5307 -5308  440  5309 0
-5306  5307 -5308  440  5310 0
-5306  5307 -5308  440 -5311 0

c  -2-1 --> break 
c    ( b^{2, 220}_2 ∧  b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨  b^{2, 220}_0 ∨  p_440 ∨ break
c  in DIMACS:
-5306 -5307  5308  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 220}_2 ∧ -b^{2, 220}_1 ∧ -b^{2, 220}_0 ∧ true) 
c  in CNF:
c    -b^{2, 220}_2 ∨  b^{2, 220}_1 ∨  b^{2, 220}_0 ∨ false 
c  in DIMACS:
-5306  5307  5308  0

c  3 does not represent an automaton state.
c    -(-b^{2, 220}_2 ∧  b^{2, 220}_1 ∧  b^{2, 220}_0 ∧ true) 
c  in CNF:
c     b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ false 
c  in DIMACS:
 5306 -5307 -5308  0
c  -3 does not represent an automaton state.
c    -( b^{2, 220}_2 ∧  b^{2, 220}_1 ∧  b^{2, 220}_0 ∧ true) 
c  in CNF:
c    -b^{2, 220}_2 ∨ -b^{2, 220}_1 ∨ -b^{2, 220}_0 ∨ false 
c  in DIMACS:
-5306 -5307 -5308  0

c i = 221
c  -2+1 --> -1
c    ( b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧  p_442) -> ( b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0)
c  in CNF:
c    -b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨  b^{2, 222}_2
c    -b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_1
c    -b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨  b^{2, 222}_0
c  in DIMACS:
-5309 -5310  5311 -442  5312 0
-5309 -5310  5311 -442 -5313 0
-5309 -5310  5311 -442  5314 0

c  -1+1 --> 0
c    ( b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0 ∧  p_442) -> (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧ -b^{2, 222}_0)
c  in CNF:
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_2
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_1
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_0
c  in DIMACS:
-5309  5310 -5311 -442 -5312 0
-5309  5310 -5311 -442 -5313 0
-5309  5310 -5311 -442 -5314 0

c  0+1 --> 1
c    (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧  p_442) -> (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0)
c  in CNF:
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_2
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_1
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨  b^{2, 222}_0
c  in DIMACS:
 5309  5310  5311 -442 -5312 0
 5309  5310  5311 -442 -5313 0
 5309  5310  5311 -442  5314 0

c  1+1 --> 2
c    (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0 ∧  p_442) -> (-b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0)
c  in CNF:
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_2
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨  b^{2, 222}_1
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ -p_442 ∨ -b^{2, 222}_0
c  in DIMACS:
 5309  5310 -5311 -442 -5312 0
 5309  5310 -5311 -442  5313 0
 5309  5310 -5311 -442 -5314 0

c  2+1 --> break 
c    (-b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧  p_442) -> break
c  in CNF:
c     b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 5309 -5310  5311 -442 1162 0


c  2-1 --> 1
c    (-b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧ -p_442) -> (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0)
c  in CNF:
c     b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_2
c     b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_1
c     b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨  b^{2, 222}_0
c  in DIMACS:
 5309 -5310  5311  442 -5312 0
 5309 -5310  5311  442 -5313 0
 5309 -5310  5311  442  5314 0

c  1-1 --> 0
c    (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0 ∧ -p_442) -> (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧ -b^{2, 222}_0)
c  in CNF:
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_2
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_1
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_0
c  in DIMACS:
 5309  5310 -5311  442 -5312 0
 5309  5310 -5311  442 -5313 0
 5309  5310 -5311  442 -5314 0

c  0-1 --> -1
c    (-b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧ -p_442) -> ( b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0)
c  in CNF:
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨  b^{2, 222}_2
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_1
c     b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨  b^{2, 222}_0
c  in DIMACS:
 5309  5310  5311  442  5312 0
 5309  5310  5311  442 -5313 0
 5309  5310  5311  442  5314 0

c  -1-1 --> -2
c    ( b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧  b^{2, 221}_0 ∧ -p_442) -> ( b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0)
c  in CNF:
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨  b^{2, 222}_2
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨  b^{2, 222}_1
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨  p_442 ∨ -b^{2, 222}_0
c  in DIMACS:
-5309  5310 -5311  442  5312 0
-5309  5310 -5311  442  5313 0
-5309  5310 -5311  442 -5314 0

c  -2-1 --> break 
c    ( b^{2, 221}_2 ∧  b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨  b^{2, 221}_0 ∨  p_442 ∨ break
c  in DIMACS:
-5309 -5310  5311  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 221}_2 ∧ -b^{2, 221}_1 ∧ -b^{2, 221}_0 ∧ true) 
c  in CNF:
c    -b^{2, 221}_2 ∨  b^{2, 221}_1 ∨  b^{2, 221}_0 ∨ false 
c  in DIMACS:
-5309  5310  5311  0

c  3 does not represent an automaton state.
c    -(-b^{2, 221}_2 ∧  b^{2, 221}_1 ∧  b^{2, 221}_0 ∧ true) 
c  in CNF:
c     b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ false 
c  in DIMACS:
 5309 -5310 -5311  0
c  -3 does not represent an automaton state.
c    -( b^{2, 221}_2 ∧  b^{2, 221}_1 ∧  b^{2, 221}_0 ∧ true) 
c  in CNF:
c    -b^{2, 221}_2 ∨ -b^{2, 221}_1 ∨ -b^{2, 221}_0 ∨ false 
c  in DIMACS:
-5309 -5310 -5311  0

c i = 222
c  -2+1 --> -1
c    ( b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧  p_444) -> ( b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0)
c  in CNF:
c    -b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨  b^{2, 223}_2
c    -b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_1
c    -b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨  b^{2, 223}_0
c  in DIMACS:
-5312 -5313  5314 -444  5315 0
-5312 -5313  5314 -444 -5316 0
-5312 -5313  5314 -444  5317 0

c  -1+1 --> 0
c    ( b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0 ∧  p_444) -> (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧ -b^{2, 223}_0)
c  in CNF:
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_2
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_1
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_0
c  in DIMACS:
-5312  5313 -5314 -444 -5315 0
-5312  5313 -5314 -444 -5316 0
-5312  5313 -5314 -444 -5317 0

c  0+1 --> 1
c    (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧  p_444) -> (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0)
c  in CNF:
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_2
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_1
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨  b^{2, 223}_0
c  in DIMACS:
 5312  5313  5314 -444 -5315 0
 5312  5313  5314 -444 -5316 0
 5312  5313  5314 -444  5317 0

c  1+1 --> 2
c    (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0 ∧  p_444) -> (-b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0)
c  in CNF:
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_2
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨  b^{2, 223}_1
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ -p_444 ∨ -b^{2, 223}_0
c  in DIMACS:
 5312  5313 -5314 -444 -5315 0
 5312  5313 -5314 -444  5316 0
 5312  5313 -5314 -444 -5317 0

c  2+1 --> break 
c    (-b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧  p_444) -> break
c  in CNF:
c     b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 5312 -5313  5314 -444 1162 0


c  2-1 --> 1
c    (-b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧ -p_444) -> (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0)
c  in CNF:
c     b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_2
c     b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_1
c     b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨  b^{2, 223}_0
c  in DIMACS:
 5312 -5313  5314  444 -5315 0
 5312 -5313  5314  444 -5316 0
 5312 -5313  5314  444  5317 0

c  1-1 --> 0
c    (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0 ∧ -p_444) -> (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧ -b^{2, 223}_0)
c  in CNF:
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_2
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_1
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_0
c  in DIMACS:
 5312  5313 -5314  444 -5315 0
 5312  5313 -5314  444 -5316 0
 5312  5313 -5314  444 -5317 0

c  0-1 --> -1
c    (-b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧ -p_444) -> ( b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0)
c  in CNF:
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨  b^{2, 223}_2
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_1
c     b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨  b^{2, 223}_0
c  in DIMACS:
 5312  5313  5314  444  5315 0
 5312  5313  5314  444 -5316 0
 5312  5313  5314  444  5317 0

c  -1-1 --> -2
c    ( b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧  b^{2, 222}_0 ∧ -p_444) -> ( b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0)
c  in CNF:
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨  b^{2, 223}_2
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨  b^{2, 223}_1
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨  p_444 ∨ -b^{2, 223}_0
c  in DIMACS:
-5312  5313 -5314  444  5315 0
-5312  5313 -5314  444  5316 0
-5312  5313 -5314  444 -5317 0

c  -2-1 --> break 
c    ( b^{2, 222}_2 ∧  b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨  b^{2, 222}_0 ∨  p_444 ∨ break
c  in DIMACS:
-5312 -5313  5314  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 222}_2 ∧ -b^{2, 222}_1 ∧ -b^{2, 222}_0 ∧ true) 
c  in CNF:
c    -b^{2, 222}_2 ∨  b^{2, 222}_1 ∨  b^{2, 222}_0 ∨ false 
c  in DIMACS:
-5312  5313  5314  0

c  3 does not represent an automaton state.
c    -(-b^{2, 222}_2 ∧  b^{2, 222}_1 ∧  b^{2, 222}_0 ∧ true) 
c  in CNF:
c     b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ false 
c  in DIMACS:
 5312 -5313 -5314  0
c  -3 does not represent an automaton state.
c    -( b^{2, 222}_2 ∧  b^{2, 222}_1 ∧  b^{2, 222}_0 ∧ true) 
c  in CNF:
c    -b^{2, 222}_2 ∨ -b^{2, 222}_1 ∨ -b^{2, 222}_0 ∨ false 
c  in DIMACS:
-5312 -5313 -5314  0

c i = 223
c  -2+1 --> -1
c    ( b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧  p_446) -> ( b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0)
c  in CNF:
c    -b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨  b^{2, 224}_2
c    -b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_1
c    -b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨  b^{2, 224}_0
c  in DIMACS:
-5315 -5316  5317 -446  5318 0
-5315 -5316  5317 -446 -5319 0
-5315 -5316  5317 -446  5320 0

c  -1+1 --> 0
c    ( b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0 ∧  p_446) -> (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧ -b^{2, 224}_0)
c  in CNF:
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_2
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_1
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_0
c  in DIMACS:
-5315  5316 -5317 -446 -5318 0
-5315  5316 -5317 -446 -5319 0
-5315  5316 -5317 -446 -5320 0

c  0+1 --> 1
c    (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧  p_446) -> (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0)
c  in CNF:
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_2
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_1
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨  b^{2, 224}_0
c  in DIMACS:
 5315  5316  5317 -446 -5318 0
 5315  5316  5317 -446 -5319 0
 5315  5316  5317 -446  5320 0

c  1+1 --> 2
c    (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0 ∧  p_446) -> (-b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0)
c  in CNF:
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_2
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨  b^{2, 224}_1
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ -p_446 ∨ -b^{2, 224}_0
c  in DIMACS:
 5315  5316 -5317 -446 -5318 0
 5315  5316 -5317 -446  5319 0
 5315  5316 -5317 -446 -5320 0

c  2+1 --> break 
c    (-b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧  p_446) -> break
c  in CNF:
c     b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ -p_446 ∨ break
c  in DIMACS:
 5315 -5316  5317 -446 1162 0


c  2-1 --> 1
c    (-b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧ -p_446) -> (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0)
c  in CNF:
c     b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_2
c     b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_1
c     b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨  b^{2, 224}_0
c  in DIMACS:
 5315 -5316  5317  446 -5318 0
 5315 -5316  5317  446 -5319 0
 5315 -5316  5317  446  5320 0

c  1-1 --> 0
c    (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0 ∧ -p_446) -> (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧ -b^{2, 224}_0)
c  in CNF:
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_2
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_1
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_0
c  in DIMACS:
 5315  5316 -5317  446 -5318 0
 5315  5316 -5317  446 -5319 0
 5315  5316 -5317  446 -5320 0

c  0-1 --> -1
c    (-b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧ -p_446) -> ( b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0)
c  in CNF:
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨  b^{2, 224}_2
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_1
c     b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨  b^{2, 224}_0
c  in DIMACS:
 5315  5316  5317  446  5318 0
 5315  5316  5317  446 -5319 0
 5315  5316  5317  446  5320 0

c  -1-1 --> -2
c    ( b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧  b^{2, 223}_0 ∧ -p_446) -> ( b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0)
c  in CNF:
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨  b^{2, 224}_2
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨  b^{2, 224}_1
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨  p_446 ∨ -b^{2, 224}_0
c  in DIMACS:
-5315  5316 -5317  446  5318 0
-5315  5316 -5317  446  5319 0
-5315  5316 -5317  446 -5320 0

c  -2-1 --> break 
c    ( b^{2, 223}_2 ∧  b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧ -p_446) -> break
c  in CNF:
c    -b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨  b^{2, 223}_0 ∨  p_446 ∨ break
c  in DIMACS:
-5315 -5316  5317  446 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 223}_2 ∧ -b^{2, 223}_1 ∧ -b^{2, 223}_0 ∧ true) 
c  in CNF:
c    -b^{2, 223}_2 ∨  b^{2, 223}_1 ∨  b^{2, 223}_0 ∨ false 
c  in DIMACS:
-5315  5316  5317  0

c  3 does not represent an automaton state.
c    -(-b^{2, 223}_2 ∧  b^{2, 223}_1 ∧  b^{2, 223}_0 ∧ true) 
c  in CNF:
c     b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ false 
c  in DIMACS:
 5315 -5316 -5317  0
c  -3 does not represent an automaton state.
c    -( b^{2, 223}_2 ∧  b^{2, 223}_1 ∧  b^{2, 223}_0 ∧ true) 
c  in CNF:
c    -b^{2, 223}_2 ∨ -b^{2, 223}_1 ∨ -b^{2, 223}_0 ∨ false 
c  in DIMACS:
-5315 -5316 -5317  0

c i = 224
c  -2+1 --> -1
c    ( b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧  p_448) -> ( b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0)
c  in CNF:
c    -b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨  b^{2, 225}_2
c    -b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_1
c    -b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨  b^{2, 225}_0
c  in DIMACS:
-5318 -5319  5320 -448  5321 0
-5318 -5319  5320 -448 -5322 0
-5318 -5319  5320 -448  5323 0

c  -1+1 --> 0
c    ( b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0 ∧  p_448) -> (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧ -b^{2, 225}_0)
c  in CNF:
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_2
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_1
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_0
c  in DIMACS:
-5318  5319 -5320 -448 -5321 0
-5318  5319 -5320 -448 -5322 0
-5318  5319 -5320 -448 -5323 0

c  0+1 --> 1
c    (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧  p_448) -> (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0)
c  in CNF:
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_2
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_1
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨  b^{2, 225}_0
c  in DIMACS:
 5318  5319  5320 -448 -5321 0
 5318  5319  5320 -448 -5322 0
 5318  5319  5320 -448  5323 0

c  1+1 --> 2
c    (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0 ∧  p_448) -> (-b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0)
c  in CNF:
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_2
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨  b^{2, 225}_1
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ -p_448 ∨ -b^{2, 225}_0
c  in DIMACS:
 5318  5319 -5320 -448 -5321 0
 5318  5319 -5320 -448  5322 0
 5318  5319 -5320 -448 -5323 0

c  2+1 --> break 
c    (-b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧  p_448) -> break
c  in CNF:
c     b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 5318 -5319  5320 -448 1162 0


c  2-1 --> 1
c    (-b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧ -p_448) -> (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0)
c  in CNF:
c     b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_2
c     b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_1
c     b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨  b^{2, 225}_0
c  in DIMACS:
 5318 -5319  5320  448 -5321 0
 5318 -5319  5320  448 -5322 0
 5318 -5319  5320  448  5323 0

c  1-1 --> 0
c    (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0 ∧ -p_448) -> (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧ -b^{2, 225}_0)
c  in CNF:
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_2
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_1
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_0
c  in DIMACS:
 5318  5319 -5320  448 -5321 0
 5318  5319 -5320  448 -5322 0
 5318  5319 -5320  448 -5323 0

c  0-1 --> -1
c    (-b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧ -p_448) -> ( b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0)
c  in CNF:
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨  b^{2, 225}_2
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_1
c     b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨  b^{2, 225}_0
c  in DIMACS:
 5318  5319  5320  448  5321 0
 5318  5319  5320  448 -5322 0
 5318  5319  5320  448  5323 0

c  -1-1 --> -2
c    ( b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧  b^{2, 224}_0 ∧ -p_448) -> ( b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0)
c  in CNF:
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨  b^{2, 225}_2
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨  b^{2, 225}_1
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨  p_448 ∨ -b^{2, 225}_0
c  in DIMACS:
-5318  5319 -5320  448  5321 0
-5318  5319 -5320  448  5322 0
-5318  5319 -5320  448 -5323 0

c  -2-1 --> break 
c    ( b^{2, 224}_2 ∧  b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨  b^{2, 224}_0 ∨  p_448 ∨ break
c  in DIMACS:
-5318 -5319  5320  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 224}_2 ∧ -b^{2, 224}_1 ∧ -b^{2, 224}_0 ∧ true) 
c  in CNF:
c    -b^{2, 224}_2 ∨  b^{2, 224}_1 ∨  b^{2, 224}_0 ∨ false 
c  in DIMACS:
-5318  5319  5320  0

c  3 does not represent an automaton state.
c    -(-b^{2, 224}_2 ∧  b^{2, 224}_1 ∧  b^{2, 224}_0 ∧ true) 
c  in CNF:
c     b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ false 
c  in DIMACS:
 5318 -5319 -5320  0
c  -3 does not represent an automaton state.
c    -( b^{2, 224}_2 ∧  b^{2, 224}_1 ∧  b^{2, 224}_0 ∧ true) 
c  in CNF:
c    -b^{2, 224}_2 ∨ -b^{2, 224}_1 ∨ -b^{2, 224}_0 ∨ false 
c  in DIMACS:
-5318 -5319 -5320  0

c i = 225
c  -2+1 --> -1
c    ( b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧  p_450) -> ( b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0)
c  in CNF:
c    -b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨  b^{2, 226}_2
c    -b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_1
c    -b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨  b^{2, 226}_0
c  in DIMACS:
-5321 -5322  5323 -450  5324 0
-5321 -5322  5323 -450 -5325 0
-5321 -5322  5323 -450  5326 0

c  -1+1 --> 0
c    ( b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0 ∧  p_450) -> (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧ -b^{2, 226}_0)
c  in CNF:
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_2
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_1
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_0
c  in DIMACS:
-5321  5322 -5323 -450 -5324 0
-5321  5322 -5323 -450 -5325 0
-5321  5322 -5323 -450 -5326 0

c  0+1 --> 1
c    (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧  p_450) -> (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0)
c  in CNF:
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_2
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_1
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨  b^{2, 226}_0
c  in DIMACS:
 5321  5322  5323 -450 -5324 0
 5321  5322  5323 -450 -5325 0
 5321  5322  5323 -450  5326 0

c  1+1 --> 2
c    (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0 ∧  p_450) -> (-b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0)
c  in CNF:
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_2
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨  b^{2, 226}_1
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ -p_450 ∨ -b^{2, 226}_0
c  in DIMACS:
 5321  5322 -5323 -450 -5324 0
 5321  5322 -5323 -450  5325 0
 5321  5322 -5323 -450 -5326 0

c  2+1 --> break 
c    (-b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧  p_450) -> break
c  in CNF:
c     b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 5321 -5322  5323 -450 1162 0


c  2-1 --> 1
c    (-b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧ -p_450) -> (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0)
c  in CNF:
c     b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_2
c     b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_1
c     b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨  b^{2, 226}_0
c  in DIMACS:
 5321 -5322  5323  450 -5324 0
 5321 -5322  5323  450 -5325 0
 5321 -5322  5323  450  5326 0

c  1-1 --> 0
c    (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0 ∧ -p_450) -> (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧ -b^{2, 226}_0)
c  in CNF:
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_2
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_1
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_0
c  in DIMACS:
 5321  5322 -5323  450 -5324 0
 5321  5322 -5323  450 -5325 0
 5321  5322 -5323  450 -5326 0

c  0-1 --> -1
c    (-b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧ -p_450) -> ( b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0)
c  in CNF:
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨  b^{2, 226}_2
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_1
c     b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨  b^{2, 226}_0
c  in DIMACS:
 5321  5322  5323  450  5324 0
 5321  5322  5323  450 -5325 0
 5321  5322  5323  450  5326 0

c  -1-1 --> -2
c    ( b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧  b^{2, 225}_0 ∧ -p_450) -> ( b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0)
c  in CNF:
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨  b^{2, 226}_2
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨  b^{2, 226}_1
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨  p_450 ∨ -b^{2, 226}_0
c  in DIMACS:
-5321  5322 -5323  450  5324 0
-5321  5322 -5323  450  5325 0
-5321  5322 -5323  450 -5326 0

c  -2-1 --> break 
c    ( b^{2, 225}_2 ∧  b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨  b^{2, 225}_0 ∨  p_450 ∨ break
c  in DIMACS:
-5321 -5322  5323  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 225}_2 ∧ -b^{2, 225}_1 ∧ -b^{2, 225}_0 ∧ true) 
c  in CNF:
c    -b^{2, 225}_2 ∨  b^{2, 225}_1 ∨  b^{2, 225}_0 ∨ false 
c  in DIMACS:
-5321  5322  5323  0

c  3 does not represent an automaton state.
c    -(-b^{2, 225}_2 ∧  b^{2, 225}_1 ∧  b^{2, 225}_0 ∧ true) 
c  in CNF:
c     b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ false 
c  in DIMACS:
 5321 -5322 -5323  0
c  -3 does not represent an automaton state.
c    -( b^{2, 225}_2 ∧  b^{2, 225}_1 ∧  b^{2, 225}_0 ∧ true) 
c  in CNF:
c    -b^{2, 225}_2 ∨ -b^{2, 225}_1 ∨ -b^{2, 225}_0 ∨ false 
c  in DIMACS:
-5321 -5322 -5323  0

c i = 226
c  -2+1 --> -1
c    ( b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧  p_452) -> ( b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0)
c  in CNF:
c    -b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨  b^{2, 227}_2
c    -b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_1
c    -b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨  b^{2, 227}_0
c  in DIMACS:
-5324 -5325  5326 -452  5327 0
-5324 -5325  5326 -452 -5328 0
-5324 -5325  5326 -452  5329 0

c  -1+1 --> 0
c    ( b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0 ∧  p_452) -> (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧ -b^{2, 227}_0)
c  in CNF:
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_2
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_1
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_0
c  in DIMACS:
-5324  5325 -5326 -452 -5327 0
-5324  5325 -5326 -452 -5328 0
-5324  5325 -5326 -452 -5329 0

c  0+1 --> 1
c    (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧  p_452) -> (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0)
c  in CNF:
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_2
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_1
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨  b^{2, 227}_0
c  in DIMACS:
 5324  5325  5326 -452 -5327 0
 5324  5325  5326 -452 -5328 0
 5324  5325  5326 -452  5329 0

c  1+1 --> 2
c    (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0 ∧  p_452) -> (-b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0)
c  in CNF:
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_2
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨  b^{2, 227}_1
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ -p_452 ∨ -b^{2, 227}_0
c  in DIMACS:
 5324  5325 -5326 -452 -5327 0
 5324  5325 -5326 -452  5328 0
 5324  5325 -5326 -452 -5329 0

c  2+1 --> break 
c    (-b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧  p_452) -> break
c  in CNF:
c     b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ -p_452 ∨ break
c  in DIMACS:
 5324 -5325  5326 -452 1162 0


c  2-1 --> 1
c    (-b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧ -p_452) -> (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0)
c  in CNF:
c     b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_2
c     b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_1
c     b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨  b^{2, 227}_0
c  in DIMACS:
 5324 -5325  5326  452 -5327 0
 5324 -5325  5326  452 -5328 0
 5324 -5325  5326  452  5329 0

c  1-1 --> 0
c    (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0 ∧ -p_452) -> (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧ -b^{2, 227}_0)
c  in CNF:
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_2
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_1
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_0
c  in DIMACS:
 5324  5325 -5326  452 -5327 0
 5324  5325 -5326  452 -5328 0
 5324  5325 -5326  452 -5329 0

c  0-1 --> -1
c    (-b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧ -p_452) -> ( b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0)
c  in CNF:
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨  b^{2, 227}_2
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_1
c     b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨  b^{2, 227}_0
c  in DIMACS:
 5324  5325  5326  452  5327 0
 5324  5325  5326  452 -5328 0
 5324  5325  5326  452  5329 0

c  -1-1 --> -2
c    ( b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧  b^{2, 226}_0 ∧ -p_452) -> ( b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0)
c  in CNF:
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨  b^{2, 227}_2
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨  b^{2, 227}_1
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨  p_452 ∨ -b^{2, 227}_0
c  in DIMACS:
-5324  5325 -5326  452  5327 0
-5324  5325 -5326  452  5328 0
-5324  5325 -5326  452 -5329 0

c  -2-1 --> break 
c    ( b^{2, 226}_2 ∧  b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧ -p_452) -> break
c  in CNF:
c    -b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨  b^{2, 226}_0 ∨  p_452 ∨ break
c  in DIMACS:
-5324 -5325  5326  452 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 226}_2 ∧ -b^{2, 226}_1 ∧ -b^{2, 226}_0 ∧ true) 
c  in CNF:
c    -b^{2, 226}_2 ∨  b^{2, 226}_1 ∨  b^{2, 226}_0 ∨ false 
c  in DIMACS:
-5324  5325  5326  0

c  3 does not represent an automaton state.
c    -(-b^{2, 226}_2 ∧  b^{2, 226}_1 ∧  b^{2, 226}_0 ∧ true) 
c  in CNF:
c     b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ false 
c  in DIMACS:
 5324 -5325 -5326  0
c  -3 does not represent an automaton state.
c    -( b^{2, 226}_2 ∧  b^{2, 226}_1 ∧  b^{2, 226}_0 ∧ true) 
c  in CNF:
c    -b^{2, 226}_2 ∨ -b^{2, 226}_1 ∨ -b^{2, 226}_0 ∨ false 
c  in DIMACS:
-5324 -5325 -5326  0

c i = 227
c  -2+1 --> -1
c    ( b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧  p_454) -> ( b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0)
c  in CNF:
c    -b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨  b^{2, 228}_2
c    -b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_1
c    -b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨  b^{2, 228}_0
c  in DIMACS:
-5327 -5328  5329 -454  5330 0
-5327 -5328  5329 -454 -5331 0
-5327 -5328  5329 -454  5332 0

c  -1+1 --> 0
c    ( b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0 ∧  p_454) -> (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧ -b^{2, 228}_0)
c  in CNF:
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_2
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_1
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_0
c  in DIMACS:
-5327  5328 -5329 -454 -5330 0
-5327  5328 -5329 -454 -5331 0
-5327  5328 -5329 -454 -5332 0

c  0+1 --> 1
c    (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧  p_454) -> (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0)
c  in CNF:
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_2
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_1
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨  b^{2, 228}_0
c  in DIMACS:
 5327  5328  5329 -454 -5330 0
 5327  5328  5329 -454 -5331 0
 5327  5328  5329 -454  5332 0

c  1+1 --> 2
c    (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0 ∧  p_454) -> (-b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0)
c  in CNF:
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_2
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨  b^{2, 228}_1
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ -p_454 ∨ -b^{2, 228}_0
c  in DIMACS:
 5327  5328 -5329 -454 -5330 0
 5327  5328 -5329 -454  5331 0
 5327  5328 -5329 -454 -5332 0

c  2+1 --> break 
c    (-b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧  p_454) -> break
c  in CNF:
c     b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ -p_454 ∨ break
c  in DIMACS:
 5327 -5328  5329 -454 1162 0


c  2-1 --> 1
c    (-b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧ -p_454) -> (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0)
c  in CNF:
c     b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_2
c     b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_1
c     b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨  b^{2, 228}_0
c  in DIMACS:
 5327 -5328  5329  454 -5330 0
 5327 -5328  5329  454 -5331 0
 5327 -5328  5329  454  5332 0

c  1-1 --> 0
c    (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0 ∧ -p_454) -> (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧ -b^{2, 228}_0)
c  in CNF:
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_2
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_1
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_0
c  in DIMACS:
 5327  5328 -5329  454 -5330 0
 5327  5328 -5329  454 -5331 0
 5327  5328 -5329  454 -5332 0

c  0-1 --> -1
c    (-b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧ -p_454) -> ( b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0)
c  in CNF:
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨  b^{2, 228}_2
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_1
c     b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨  b^{2, 228}_0
c  in DIMACS:
 5327  5328  5329  454  5330 0
 5327  5328  5329  454 -5331 0
 5327  5328  5329  454  5332 0

c  -1-1 --> -2
c    ( b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧  b^{2, 227}_0 ∧ -p_454) -> ( b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0)
c  in CNF:
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨  b^{2, 228}_2
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨  b^{2, 228}_1
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨  p_454 ∨ -b^{2, 228}_0
c  in DIMACS:
-5327  5328 -5329  454  5330 0
-5327  5328 -5329  454  5331 0
-5327  5328 -5329  454 -5332 0

c  -2-1 --> break 
c    ( b^{2, 227}_2 ∧  b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧ -p_454) -> break
c  in CNF:
c    -b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨  b^{2, 227}_0 ∨  p_454 ∨ break
c  in DIMACS:
-5327 -5328  5329  454 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 227}_2 ∧ -b^{2, 227}_1 ∧ -b^{2, 227}_0 ∧ true) 
c  in CNF:
c    -b^{2, 227}_2 ∨  b^{2, 227}_1 ∨  b^{2, 227}_0 ∨ false 
c  in DIMACS:
-5327  5328  5329  0

c  3 does not represent an automaton state.
c    -(-b^{2, 227}_2 ∧  b^{2, 227}_1 ∧  b^{2, 227}_0 ∧ true) 
c  in CNF:
c     b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ false 
c  in DIMACS:
 5327 -5328 -5329  0
c  -3 does not represent an automaton state.
c    -( b^{2, 227}_2 ∧  b^{2, 227}_1 ∧  b^{2, 227}_0 ∧ true) 
c  in CNF:
c    -b^{2, 227}_2 ∨ -b^{2, 227}_1 ∨ -b^{2, 227}_0 ∨ false 
c  in DIMACS:
-5327 -5328 -5329  0

c i = 228
c  -2+1 --> -1
c    ( b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧  p_456) -> ( b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0)
c  in CNF:
c    -b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨  b^{2, 229}_2
c    -b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_1
c    -b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨  b^{2, 229}_0
c  in DIMACS:
-5330 -5331  5332 -456  5333 0
-5330 -5331  5332 -456 -5334 0
-5330 -5331  5332 -456  5335 0

c  -1+1 --> 0
c    ( b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0 ∧  p_456) -> (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧ -b^{2, 229}_0)
c  in CNF:
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_2
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_1
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_0
c  in DIMACS:
-5330  5331 -5332 -456 -5333 0
-5330  5331 -5332 -456 -5334 0
-5330  5331 -5332 -456 -5335 0

c  0+1 --> 1
c    (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧  p_456) -> (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0)
c  in CNF:
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_2
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_1
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨  b^{2, 229}_0
c  in DIMACS:
 5330  5331  5332 -456 -5333 0
 5330  5331  5332 -456 -5334 0
 5330  5331  5332 -456  5335 0

c  1+1 --> 2
c    (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0 ∧  p_456) -> (-b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0)
c  in CNF:
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_2
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨  b^{2, 229}_1
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ -p_456 ∨ -b^{2, 229}_0
c  in DIMACS:
 5330  5331 -5332 -456 -5333 0
 5330  5331 -5332 -456  5334 0
 5330  5331 -5332 -456 -5335 0

c  2+1 --> break 
c    (-b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧  p_456) -> break
c  in CNF:
c     b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 5330 -5331  5332 -456 1162 0


c  2-1 --> 1
c    (-b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧ -p_456) -> (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0)
c  in CNF:
c     b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_2
c     b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_1
c     b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨  b^{2, 229}_0
c  in DIMACS:
 5330 -5331  5332  456 -5333 0
 5330 -5331  5332  456 -5334 0
 5330 -5331  5332  456  5335 0

c  1-1 --> 0
c    (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0 ∧ -p_456) -> (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧ -b^{2, 229}_0)
c  in CNF:
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_2
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_1
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_0
c  in DIMACS:
 5330  5331 -5332  456 -5333 0
 5330  5331 -5332  456 -5334 0
 5330  5331 -5332  456 -5335 0

c  0-1 --> -1
c    (-b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧ -p_456) -> ( b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0)
c  in CNF:
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨  b^{2, 229}_2
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_1
c     b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨  b^{2, 229}_0
c  in DIMACS:
 5330  5331  5332  456  5333 0
 5330  5331  5332  456 -5334 0
 5330  5331  5332  456  5335 0

c  -1-1 --> -2
c    ( b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧  b^{2, 228}_0 ∧ -p_456) -> ( b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0)
c  in CNF:
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨  b^{2, 229}_2
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨  b^{2, 229}_1
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨  p_456 ∨ -b^{2, 229}_0
c  in DIMACS:
-5330  5331 -5332  456  5333 0
-5330  5331 -5332  456  5334 0
-5330  5331 -5332  456 -5335 0

c  -2-1 --> break 
c    ( b^{2, 228}_2 ∧  b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨  b^{2, 228}_0 ∨  p_456 ∨ break
c  in DIMACS:
-5330 -5331  5332  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 228}_2 ∧ -b^{2, 228}_1 ∧ -b^{2, 228}_0 ∧ true) 
c  in CNF:
c    -b^{2, 228}_2 ∨  b^{2, 228}_1 ∨  b^{2, 228}_0 ∨ false 
c  in DIMACS:
-5330  5331  5332  0

c  3 does not represent an automaton state.
c    -(-b^{2, 228}_2 ∧  b^{2, 228}_1 ∧  b^{2, 228}_0 ∧ true) 
c  in CNF:
c     b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ false 
c  in DIMACS:
 5330 -5331 -5332  0
c  -3 does not represent an automaton state.
c    -( b^{2, 228}_2 ∧  b^{2, 228}_1 ∧  b^{2, 228}_0 ∧ true) 
c  in CNF:
c    -b^{2, 228}_2 ∨ -b^{2, 228}_1 ∨ -b^{2, 228}_0 ∨ false 
c  in DIMACS:
-5330 -5331 -5332  0

c i = 229
c  -2+1 --> -1
c    ( b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧  p_458) -> ( b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0)
c  in CNF:
c    -b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨  b^{2, 230}_2
c    -b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_1
c    -b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨  b^{2, 230}_0
c  in DIMACS:
-5333 -5334  5335 -458  5336 0
-5333 -5334  5335 -458 -5337 0
-5333 -5334  5335 -458  5338 0

c  -1+1 --> 0
c    ( b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0 ∧  p_458) -> (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧ -b^{2, 230}_0)
c  in CNF:
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_2
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_1
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_0
c  in DIMACS:
-5333  5334 -5335 -458 -5336 0
-5333  5334 -5335 -458 -5337 0
-5333  5334 -5335 -458 -5338 0

c  0+1 --> 1
c    (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧  p_458) -> (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0)
c  in CNF:
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_2
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_1
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨  b^{2, 230}_0
c  in DIMACS:
 5333  5334  5335 -458 -5336 0
 5333  5334  5335 -458 -5337 0
 5333  5334  5335 -458  5338 0

c  1+1 --> 2
c    (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0 ∧  p_458) -> (-b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0)
c  in CNF:
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_2
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨  b^{2, 230}_1
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ -p_458 ∨ -b^{2, 230}_0
c  in DIMACS:
 5333  5334 -5335 -458 -5336 0
 5333  5334 -5335 -458  5337 0
 5333  5334 -5335 -458 -5338 0

c  2+1 --> break 
c    (-b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧  p_458) -> break
c  in CNF:
c     b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ -p_458 ∨ break
c  in DIMACS:
 5333 -5334  5335 -458 1162 0


c  2-1 --> 1
c    (-b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧ -p_458) -> (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0)
c  in CNF:
c     b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_2
c     b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_1
c     b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨  b^{2, 230}_0
c  in DIMACS:
 5333 -5334  5335  458 -5336 0
 5333 -5334  5335  458 -5337 0
 5333 -5334  5335  458  5338 0

c  1-1 --> 0
c    (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0 ∧ -p_458) -> (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧ -b^{2, 230}_0)
c  in CNF:
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_2
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_1
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_0
c  in DIMACS:
 5333  5334 -5335  458 -5336 0
 5333  5334 -5335  458 -5337 0
 5333  5334 -5335  458 -5338 0

c  0-1 --> -1
c    (-b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧ -p_458) -> ( b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0)
c  in CNF:
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨  b^{2, 230}_2
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_1
c     b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨  b^{2, 230}_0
c  in DIMACS:
 5333  5334  5335  458  5336 0
 5333  5334  5335  458 -5337 0
 5333  5334  5335  458  5338 0

c  -1-1 --> -2
c    ( b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧  b^{2, 229}_0 ∧ -p_458) -> ( b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0)
c  in CNF:
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨  b^{2, 230}_2
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨  b^{2, 230}_1
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨  p_458 ∨ -b^{2, 230}_0
c  in DIMACS:
-5333  5334 -5335  458  5336 0
-5333  5334 -5335  458  5337 0
-5333  5334 -5335  458 -5338 0

c  -2-1 --> break 
c    ( b^{2, 229}_2 ∧  b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧ -p_458) -> break
c  in CNF:
c    -b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨  b^{2, 229}_0 ∨  p_458 ∨ break
c  in DIMACS:
-5333 -5334  5335  458 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 229}_2 ∧ -b^{2, 229}_1 ∧ -b^{2, 229}_0 ∧ true) 
c  in CNF:
c    -b^{2, 229}_2 ∨  b^{2, 229}_1 ∨  b^{2, 229}_0 ∨ false 
c  in DIMACS:
-5333  5334  5335  0

c  3 does not represent an automaton state.
c    -(-b^{2, 229}_2 ∧  b^{2, 229}_1 ∧  b^{2, 229}_0 ∧ true) 
c  in CNF:
c     b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ false 
c  in DIMACS:
 5333 -5334 -5335  0
c  -3 does not represent an automaton state.
c    -( b^{2, 229}_2 ∧  b^{2, 229}_1 ∧  b^{2, 229}_0 ∧ true) 
c  in CNF:
c    -b^{2, 229}_2 ∨ -b^{2, 229}_1 ∨ -b^{2, 229}_0 ∨ false 
c  in DIMACS:
-5333 -5334 -5335  0

c i = 230
c  -2+1 --> -1
c    ( b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧  p_460) -> ( b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0)
c  in CNF:
c    -b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨  b^{2, 231}_2
c    -b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_1
c    -b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨  b^{2, 231}_0
c  in DIMACS:
-5336 -5337  5338 -460  5339 0
-5336 -5337  5338 -460 -5340 0
-5336 -5337  5338 -460  5341 0

c  -1+1 --> 0
c    ( b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0 ∧  p_460) -> (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧ -b^{2, 231}_0)
c  in CNF:
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_2
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_1
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_0
c  in DIMACS:
-5336  5337 -5338 -460 -5339 0
-5336  5337 -5338 -460 -5340 0
-5336  5337 -5338 -460 -5341 0

c  0+1 --> 1
c    (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧  p_460) -> (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0)
c  in CNF:
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_2
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_1
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨  b^{2, 231}_0
c  in DIMACS:
 5336  5337  5338 -460 -5339 0
 5336  5337  5338 -460 -5340 0
 5336  5337  5338 -460  5341 0

c  1+1 --> 2
c    (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0 ∧  p_460) -> (-b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0)
c  in CNF:
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_2
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨  b^{2, 231}_1
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ -p_460 ∨ -b^{2, 231}_0
c  in DIMACS:
 5336  5337 -5338 -460 -5339 0
 5336  5337 -5338 -460  5340 0
 5336  5337 -5338 -460 -5341 0

c  2+1 --> break 
c    (-b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧  p_460) -> break
c  in CNF:
c     b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 5336 -5337  5338 -460 1162 0


c  2-1 --> 1
c    (-b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧ -p_460) -> (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0)
c  in CNF:
c     b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_2
c     b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_1
c     b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨  b^{2, 231}_0
c  in DIMACS:
 5336 -5337  5338  460 -5339 0
 5336 -5337  5338  460 -5340 0
 5336 -5337  5338  460  5341 0

c  1-1 --> 0
c    (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0 ∧ -p_460) -> (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧ -b^{2, 231}_0)
c  in CNF:
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_2
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_1
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_0
c  in DIMACS:
 5336  5337 -5338  460 -5339 0
 5336  5337 -5338  460 -5340 0
 5336  5337 -5338  460 -5341 0

c  0-1 --> -1
c    (-b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧ -p_460) -> ( b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0)
c  in CNF:
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨  b^{2, 231}_2
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_1
c     b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨  b^{2, 231}_0
c  in DIMACS:
 5336  5337  5338  460  5339 0
 5336  5337  5338  460 -5340 0
 5336  5337  5338  460  5341 0

c  -1-1 --> -2
c    ( b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧  b^{2, 230}_0 ∧ -p_460) -> ( b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0)
c  in CNF:
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨  b^{2, 231}_2
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨  b^{2, 231}_1
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨  p_460 ∨ -b^{2, 231}_0
c  in DIMACS:
-5336  5337 -5338  460  5339 0
-5336  5337 -5338  460  5340 0
-5336  5337 -5338  460 -5341 0

c  -2-1 --> break 
c    ( b^{2, 230}_2 ∧  b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨  b^{2, 230}_0 ∨  p_460 ∨ break
c  in DIMACS:
-5336 -5337  5338  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 230}_2 ∧ -b^{2, 230}_1 ∧ -b^{2, 230}_0 ∧ true) 
c  in CNF:
c    -b^{2, 230}_2 ∨  b^{2, 230}_1 ∨  b^{2, 230}_0 ∨ false 
c  in DIMACS:
-5336  5337  5338  0

c  3 does not represent an automaton state.
c    -(-b^{2, 230}_2 ∧  b^{2, 230}_1 ∧  b^{2, 230}_0 ∧ true) 
c  in CNF:
c     b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ false 
c  in DIMACS:
 5336 -5337 -5338  0
c  -3 does not represent an automaton state.
c    -( b^{2, 230}_2 ∧  b^{2, 230}_1 ∧  b^{2, 230}_0 ∧ true) 
c  in CNF:
c    -b^{2, 230}_2 ∨ -b^{2, 230}_1 ∨ -b^{2, 230}_0 ∨ false 
c  in DIMACS:
-5336 -5337 -5338  0

c i = 231
c  -2+1 --> -1
c    ( b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧  p_462) -> ( b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0)
c  in CNF:
c    -b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨  b^{2, 232}_2
c    -b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_1
c    -b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨  b^{2, 232}_0
c  in DIMACS:
-5339 -5340  5341 -462  5342 0
-5339 -5340  5341 -462 -5343 0
-5339 -5340  5341 -462  5344 0

c  -1+1 --> 0
c    ( b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0 ∧  p_462) -> (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧ -b^{2, 232}_0)
c  in CNF:
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_2
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_1
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_0
c  in DIMACS:
-5339  5340 -5341 -462 -5342 0
-5339  5340 -5341 -462 -5343 0
-5339  5340 -5341 -462 -5344 0

c  0+1 --> 1
c    (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧  p_462) -> (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0)
c  in CNF:
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_2
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_1
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨  b^{2, 232}_0
c  in DIMACS:
 5339  5340  5341 -462 -5342 0
 5339  5340  5341 -462 -5343 0
 5339  5340  5341 -462  5344 0

c  1+1 --> 2
c    (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0 ∧  p_462) -> (-b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0)
c  in CNF:
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_2
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨  b^{2, 232}_1
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ -p_462 ∨ -b^{2, 232}_0
c  in DIMACS:
 5339  5340 -5341 -462 -5342 0
 5339  5340 -5341 -462  5343 0
 5339  5340 -5341 -462 -5344 0

c  2+1 --> break 
c    (-b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧  p_462) -> break
c  in CNF:
c     b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 5339 -5340  5341 -462 1162 0


c  2-1 --> 1
c    (-b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧ -p_462) -> (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0)
c  in CNF:
c     b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_2
c     b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_1
c     b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨  b^{2, 232}_0
c  in DIMACS:
 5339 -5340  5341  462 -5342 0
 5339 -5340  5341  462 -5343 0
 5339 -5340  5341  462  5344 0

c  1-1 --> 0
c    (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0 ∧ -p_462) -> (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧ -b^{2, 232}_0)
c  in CNF:
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_2
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_1
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_0
c  in DIMACS:
 5339  5340 -5341  462 -5342 0
 5339  5340 -5341  462 -5343 0
 5339  5340 -5341  462 -5344 0

c  0-1 --> -1
c    (-b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧ -p_462) -> ( b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0)
c  in CNF:
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨  b^{2, 232}_2
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_1
c     b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨  b^{2, 232}_0
c  in DIMACS:
 5339  5340  5341  462  5342 0
 5339  5340  5341  462 -5343 0
 5339  5340  5341  462  5344 0

c  -1-1 --> -2
c    ( b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧  b^{2, 231}_0 ∧ -p_462) -> ( b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0)
c  in CNF:
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨  b^{2, 232}_2
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨  b^{2, 232}_1
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨  p_462 ∨ -b^{2, 232}_0
c  in DIMACS:
-5339  5340 -5341  462  5342 0
-5339  5340 -5341  462  5343 0
-5339  5340 -5341  462 -5344 0

c  -2-1 --> break 
c    ( b^{2, 231}_2 ∧  b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨  b^{2, 231}_0 ∨  p_462 ∨ break
c  in DIMACS:
-5339 -5340  5341  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 231}_2 ∧ -b^{2, 231}_1 ∧ -b^{2, 231}_0 ∧ true) 
c  in CNF:
c    -b^{2, 231}_2 ∨  b^{2, 231}_1 ∨  b^{2, 231}_0 ∨ false 
c  in DIMACS:
-5339  5340  5341  0

c  3 does not represent an automaton state.
c    -(-b^{2, 231}_2 ∧  b^{2, 231}_1 ∧  b^{2, 231}_0 ∧ true) 
c  in CNF:
c     b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ false 
c  in DIMACS:
 5339 -5340 -5341  0
c  -3 does not represent an automaton state.
c    -( b^{2, 231}_2 ∧  b^{2, 231}_1 ∧  b^{2, 231}_0 ∧ true) 
c  in CNF:
c    -b^{2, 231}_2 ∨ -b^{2, 231}_1 ∨ -b^{2, 231}_0 ∨ false 
c  in DIMACS:
-5339 -5340 -5341  0

c i = 232
c  -2+1 --> -1
c    ( b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧  p_464) -> ( b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0)
c  in CNF:
c    -b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨  b^{2, 233}_2
c    -b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_1
c    -b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨  b^{2, 233}_0
c  in DIMACS:
-5342 -5343  5344 -464  5345 0
-5342 -5343  5344 -464 -5346 0
-5342 -5343  5344 -464  5347 0

c  -1+1 --> 0
c    ( b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0 ∧  p_464) -> (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧ -b^{2, 233}_0)
c  in CNF:
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_2
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_1
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_0
c  in DIMACS:
-5342  5343 -5344 -464 -5345 0
-5342  5343 -5344 -464 -5346 0
-5342  5343 -5344 -464 -5347 0

c  0+1 --> 1
c    (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧  p_464) -> (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0)
c  in CNF:
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_2
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_1
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨  b^{2, 233}_0
c  in DIMACS:
 5342  5343  5344 -464 -5345 0
 5342  5343  5344 -464 -5346 0
 5342  5343  5344 -464  5347 0

c  1+1 --> 2
c    (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0 ∧  p_464) -> (-b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0)
c  in CNF:
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_2
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨  b^{2, 233}_1
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ -p_464 ∨ -b^{2, 233}_0
c  in DIMACS:
 5342  5343 -5344 -464 -5345 0
 5342  5343 -5344 -464  5346 0
 5342  5343 -5344 -464 -5347 0

c  2+1 --> break 
c    (-b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧  p_464) -> break
c  in CNF:
c     b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 5342 -5343  5344 -464 1162 0


c  2-1 --> 1
c    (-b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧ -p_464) -> (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0)
c  in CNF:
c     b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_2
c     b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_1
c     b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨  b^{2, 233}_0
c  in DIMACS:
 5342 -5343  5344  464 -5345 0
 5342 -5343  5344  464 -5346 0
 5342 -5343  5344  464  5347 0

c  1-1 --> 0
c    (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0 ∧ -p_464) -> (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧ -b^{2, 233}_0)
c  in CNF:
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_2
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_1
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_0
c  in DIMACS:
 5342  5343 -5344  464 -5345 0
 5342  5343 -5344  464 -5346 0
 5342  5343 -5344  464 -5347 0

c  0-1 --> -1
c    (-b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧ -p_464) -> ( b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0)
c  in CNF:
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨  b^{2, 233}_2
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_1
c     b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨  b^{2, 233}_0
c  in DIMACS:
 5342  5343  5344  464  5345 0
 5342  5343  5344  464 -5346 0
 5342  5343  5344  464  5347 0

c  -1-1 --> -2
c    ( b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧  b^{2, 232}_0 ∧ -p_464) -> ( b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0)
c  in CNF:
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨  b^{2, 233}_2
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨  b^{2, 233}_1
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨  p_464 ∨ -b^{2, 233}_0
c  in DIMACS:
-5342  5343 -5344  464  5345 0
-5342  5343 -5344  464  5346 0
-5342  5343 -5344  464 -5347 0

c  -2-1 --> break 
c    ( b^{2, 232}_2 ∧  b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨  b^{2, 232}_0 ∨  p_464 ∨ break
c  in DIMACS:
-5342 -5343  5344  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 232}_2 ∧ -b^{2, 232}_1 ∧ -b^{2, 232}_0 ∧ true) 
c  in CNF:
c    -b^{2, 232}_2 ∨  b^{2, 232}_1 ∨  b^{2, 232}_0 ∨ false 
c  in DIMACS:
-5342  5343  5344  0

c  3 does not represent an automaton state.
c    -(-b^{2, 232}_2 ∧  b^{2, 232}_1 ∧  b^{2, 232}_0 ∧ true) 
c  in CNF:
c     b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ false 
c  in DIMACS:
 5342 -5343 -5344  0
c  -3 does not represent an automaton state.
c    -( b^{2, 232}_2 ∧  b^{2, 232}_1 ∧  b^{2, 232}_0 ∧ true) 
c  in CNF:
c    -b^{2, 232}_2 ∨ -b^{2, 232}_1 ∨ -b^{2, 232}_0 ∨ false 
c  in DIMACS:
-5342 -5343 -5344  0

c i = 233
c  -2+1 --> -1
c    ( b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧  p_466) -> ( b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0)
c  in CNF:
c    -b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨  b^{2, 234}_2
c    -b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_1
c    -b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨  b^{2, 234}_0
c  in DIMACS:
-5345 -5346  5347 -466  5348 0
-5345 -5346  5347 -466 -5349 0
-5345 -5346  5347 -466  5350 0

c  -1+1 --> 0
c    ( b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0 ∧  p_466) -> (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧ -b^{2, 234}_0)
c  in CNF:
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_2
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_1
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_0
c  in DIMACS:
-5345  5346 -5347 -466 -5348 0
-5345  5346 -5347 -466 -5349 0
-5345  5346 -5347 -466 -5350 0

c  0+1 --> 1
c    (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧  p_466) -> (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0)
c  in CNF:
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_2
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_1
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨  b^{2, 234}_0
c  in DIMACS:
 5345  5346  5347 -466 -5348 0
 5345  5346  5347 -466 -5349 0
 5345  5346  5347 -466  5350 0

c  1+1 --> 2
c    (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0 ∧  p_466) -> (-b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0)
c  in CNF:
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_2
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨  b^{2, 234}_1
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ -p_466 ∨ -b^{2, 234}_0
c  in DIMACS:
 5345  5346 -5347 -466 -5348 0
 5345  5346 -5347 -466  5349 0
 5345  5346 -5347 -466 -5350 0

c  2+1 --> break 
c    (-b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧  p_466) -> break
c  in CNF:
c     b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ -p_466 ∨ break
c  in DIMACS:
 5345 -5346  5347 -466 1162 0


c  2-1 --> 1
c    (-b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧ -p_466) -> (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0)
c  in CNF:
c     b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_2
c     b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_1
c     b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨  b^{2, 234}_0
c  in DIMACS:
 5345 -5346  5347  466 -5348 0
 5345 -5346  5347  466 -5349 0
 5345 -5346  5347  466  5350 0

c  1-1 --> 0
c    (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0 ∧ -p_466) -> (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧ -b^{2, 234}_0)
c  in CNF:
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_2
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_1
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_0
c  in DIMACS:
 5345  5346 -5347  466 -5348 0
 5345  5346 -5347  466 -5349 0
 5345  5346 -5347  466 -5350 0

c  0-1 --> -1
c    (-b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧ -p_466) -> ( b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0)
c  in CNF:
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨  b^{2, 234}_2
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_1
c     b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨  b^{2, 234}_0
c  in DIMACS:
 5345  5346  5347  466  5348 0
 5345  5346  5347  466 -5349 0
 5345  5346  5347  466  5350 0

c  -1-1 --> -2
c    ( b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧  b^{2, 233}_0 ∧ -p_466) -> ( b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0)
c  in CNF:
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨  b^{2, 234}_2
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨  b^{2, 234}_1
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨  p_466 ∨ -b^{2, 234}_0
c  in DIMACS:
-5345  5346 -5347  466  5348 0
-5345  5346 -5347  466  5349 0
-5345  5346 -5347  466 -5350 0

c  -2-1 --> break 
c    ( b^{2, 233}_2 ∧  b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧ -p_466) -> break
c  in CNF:
c    -b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨  b^{2, 233}_0 ∨  p_466 ∨ break
c  in DIMACS:
-5345 -5346  5347  466 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 233}_2 ∧ -b^{2, 233}_1 ∧ -b^{2, 233}_0 ∧ true) 
c  in CNF:
c    -b^{2, 233}_2 ∨  b^{2, 233}_1 ∨  b^{2, 233}_0 ∨ false 
c  in DIMACS:
-5345  5346  5347  0

c  3 does not represent an automaton state.
c    -(-b^{2, 233}_2 ∧  b^{2, 233}_1 ∧  b^{2, 233}_0 ∧ true) 
c  in CNF:
c     b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ false 
c  in DIMACS:
 5345 -5346 -5347  0
c  -3 does not represent an automaton state.
c    -( b^{2, 233}_2 ∧  b^{2, 233}_1 ∧  b^{2, 233}_0 ∧ true) 
c  in CNF:
c    -b^{2, 233}_2 ∨ -b^{2, 233}_1 ∨ -b^{2, 233}_0 ∨ false 
c  in DIMACS:
-5345 -5346 -5347  0

c i = 234
c  -2+1 --> -1
c    ( b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧  p_468) -> ( b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0)
c  in CNF:
c    -b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨  b^{2, 235}_2
c    -b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_1
c    -b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨  b^{2, 235}_0
c  in DIMACS:
-5348 -5349  5350 -468  5351 0
-5348 -5349  5350 -468 -5352 0
-5348 -5349  5350 -468  5353 0

c  -1+1 --> 0
c    ( b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0 ∧  p_468) -> (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧ -b^{2, 235}_0)
c  in CNF:
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_2
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_1
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_0
c  in DIMACS:
-5348  5349 -5350 -468 -5351 0
-5348  5349 -5350 -468 -5352 0
-5348  5349 -5350 -468 -5353 0

c  0+1 --> 1
c    (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧  p_468) -> (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0)
c  in CNF:
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_2
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_1
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨  b^{2, 235}_0
c  in DIMACS:
 5348  5349  5350 -468 -5351 0
 5348  5349  5350 -468 -5352 0
 5348  5349  5350 -468  5353 0

c  1+1 --> 2
c    (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0 ∧  p_468) -> (-b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0)
c  in CNF:
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_2
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨  b^{2, 235}_1
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ -p_468 ∨ -b^{2, 235}_0
c  in DIMACS:
 5348  5349 -5350 -468 -5351 0
 5348  5349 -5350 -468  5352 0
 5348  5349 -5350 -468 -5353 0

c  2+1 --> break 
c    (-b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧  p_468) -> break
c  in CNF:
c     b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 5348 -5349  5350 -468 1162 0


c  2-1 --> 1
c    (-b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧ -p_468) -> (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0)
c  in CNF:
c     b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_2
c     b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_1
c     b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨  b^{2, 235}_0
c  in DIMACS:
 5348 -5349  5350  468 -5351 0
 5348 -5349  5350  468 -5352 0
 5348 -5349  5350  468  5353 0

c  1-1 --> 0
c    (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0 ∧ -p_468) -> (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧ -b^{2, 235}_0)
c  in CNF:
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_2
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_1
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_0
c  in DIMACS:
 5348  5349 -5350  468 -5351 0
 5348  5349 -5350  468 -5352 0
 5348  5349 -5350  468 -5353 0

c  0-1 --> -1
c    (-b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧ -p_468) -> ( b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0)
c  in CNF:
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨  b^{2, 235}_2
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_1
c     b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨  b^{2, 235}_0
c  in DIMACS:
 5348  5349  5350  468  5351 0
 5348  5349  5350  468 -5352 0
 5348  5349  5350  468  5353 0

c  -1-1 --> -2
c    ( b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧  b^{2, 234}_0 ∧ -p_468) -> ( b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0)
c  in CNF:
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨  b^{2, 235}_2
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨  b^{2, 235}_1
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨  p_468 ∨ -b^{2, 235}_0
c  in DIMACS:
-5348  5349 -5350  468  5351 0
-5348  5349 -5350  468  5352 0
-5348  5349 -5350  468 -5353 0

c  -2-1 --> break 
c    ( b^{2, 234}_2 ∧  b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨  b^{2, 234}_0 ∨  p_468 ∨ break
c  in DIMACS:
-5348 -5349  5350  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 234}_2 ∧ -b^{2, 234}_1 ∧ -b^{2, 234}_0 ∧ true) 
c  in CNF:
c    -b^{2, 234}_2 ∨  b^{2, 234}_1 ∨  b^{2, 234}_0 ∨ false 
c  in DIMACS:
-5348  5349  5350  0

c  3 does not represent an automaton state.
c    -(-b^{2, 234}_2 ∧  b^{2, 234}_1 ∧  b^{2, 234}_0 ∧ true) 
c  in CNF:
c     b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ false 
c  in DIMACS:
 5348 -5349 -5350  0
c  -3 does not represent an automaton state.
c    -( b^{2, 234}_2 ∧  b^{2, 234}_1 ∧  b^{2, 234}_0 ∧ true) 
c  in CNF:
c    -b^{2, 234}_2 ∨ -b^{2, 234}_1 ∨ -b^{2, 234}_0 ∨ false 
c  in DIMACS:
-5348 -5349 -5350  0

c i = 235
c  -2+1 --> -1
c    ( b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧  p_470) -> ( b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0)
c  in CNF:
c    -b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨  b^{2, 236}_2
c    -b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_1
c    -b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨  b^{2, 236}_0
c  in DIMACS:
-5351 -5352  5353 -470  5354 0
-5351 -5352  5353 -470 -5355 0
-5351 -5352  5353 -470  5356 0

c  -1+1 --> 0
c    ( b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0 ∧  p_470) -> (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧ -b^{2, 236}_0)
c  in CNF:
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_2
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_1
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_0
c  in DIMACS:
-5351  5352 -5353 -470 -5354 0
-5351  5352 -5353 -470 -5355 0
-5351  5352 -5353 -470 -5356 0

c  0+1 --> 1
c    (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧  p_470) -> (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0)
c  in CNF:
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_2
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_1
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨  b^{2, 236}_0
c  in DIMACS:
 5351  5352  5353 -470 -5354 0
 5351  5352  5353 -470 -5355 0
 5351  5352  5353 -470  5356 0

c  1+1 --> 2
c    (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0 ∧  p_470) -> (-b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0)
c  in CNF:
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_2
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨  b^{2, 236}_1
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ -p_470 ∨ -b^{2, 236}_0
c  in DIMACS:
 5351  5352 -5353 -470 -5354 0
 5351  5352 -5353 -470  5355 0
 5351  5352 -5353 -470 -5356 0

c  2+1 --> break 
c    (-b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧  p_470) -> break
c  in CNF:
c     b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 5351 -5352  5353 -470 1162 0


c  2-1 --> 1
c    (-b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧ -p_470) -> (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0)
c  in CNF:
c     b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_2
c     b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_1
c     b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨  b^{2, 236}_0
c  in DIMACS:
 5351 -5352  5353  470 -5354 0
 5351 -5352  5353  470 -5355 0
 5351 -5352  5353  470  5356 0

c  1-1 --> 0
c    (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0 ∧ -p_470) -> (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧ -b^{2, 236}_0)
c  in CNF:
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_2
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_1
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_0
c  in DIMACS:
 5351  5352 -5353  470 -5354 0
 5351  5352 -5353  470 -5355 0
 5351  5352 -5353  470 -5356 0

c  0-1 --> -1
c    (-b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧ -p_470) -> ( b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0)
c  in CNF:
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨  b^{2, 236}_2
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_1
c     b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨  b^{2, 236}_0
c  in DIMACS:
 5351  5352  5353  470  5354 0
 5351  5352  5353  470 -5355 0
 5351  5352  5353  470  5356 0

c  -1-1 --> -2
c    ( b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧  b^{2, 235}_0 ∧ -p_470) -> ( b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0)
c  in CNF:
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨  b^{2, 236}_2
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨  b^{2, 236}_1
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨  p_470 ∨ -b^{2, 236}_0
c  in DIMACS:
-5351  5352 -5353  470  5354 0
-5351  5352 -5353  470  5355 0
-5351  5352 -5353  470 -5356 0

c  -2-1 --> break 
c    ( b^{2, 235}_2 ∧  b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨  b^{2, 235}_0 ∨  p_470 ∨ break
c  in DIMACS:
-5351 -5352  5353  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 235}_2 ∧ -b^{2, 235}_1 ∧ -b^{2, 235}_0 ∧ true) 
c  in CNF:
c    -b^{2, 235}_2 ∨  b^{2, 235}_1 ∨  b^{2, 235}_0 ∨ false 
c  in DIMACS:
-5351  5352  5353  0

c  3 does not represent an automaton state.
c    -(-b^{2, 235}_2 ∧  b^{2, 235}_1 ∧  b^{2, 235}_0 ∧ true) 
c  in CNF:
c     b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ false 
c  in DIMACS:
 5351 -5352 -5353  0
c  -3 does not represent an automaton state.
c    -( b^{2, 235}_2 ∧  b^{2, 235}_1 ∧  b^{2, 235}_0 ∧ true) 
c  in CNF:
c    -b^{2, 235}_2 ∨ -b^{2, 235}_1 ∨ -b^{2, 235}_0 ∨ false 
c  in DIMACS:
-5351 -5352 -5353  0

c i = 236
c  -2+1 --> -1
c    ( b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧  p_472) -> ( b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0)
c  in CNF:
c    -b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨  b^{2, 237}_2
c    -b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_1
c    -b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨  b^{2, 237}_0
c  in DIMACS:
-5354 -5355  5356 -472  5357 0
-5354 -5355  5356 -472 -5358 0
-5354 -5355  5356 -472  5359 0

c  -1+1 --> 0
c    ( b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0 ∧  p_472) -> (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧ -b^{2, 237}_0)
c  in CNF:
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_2
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_1
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_0
c  in DIMACS:
-5354  5355 -5356 -472 -5357 0
-5354  5355 -5356 -472 -5358 0
-5354  5355 -5356 -472 -5359 0

c  0+1 --> 1
c    (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧  p_472) -> (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0)
c  in CNF:
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_2
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_1
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨  b^{2, 237}_0
c  in DIMACS:
 5354  5355  5356 -472 -5357 0
 5354  5355  5356 -472 -5358 0
 5354  5355  5356 -472  5359 0

c  1+1 --> 2
c    (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0 ∧  p_472) -> (-b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0)
c  in CNF:
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_2
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨  b^{2, 237}_1
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ -p_472 ∨ -b^{2, 237}_0
c  in DIMACS:
 5354  5355 -5356 -472 -5357 0
 5354  5355 -5356 -472  5358 0
 5354  5355 -5356 -472 -5359 0

c  2+1 --> break 
c    (-b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧  p_472) -> break
c  in CNF:
c     b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 5354 -5355  5356 -472 1162 0


c  2-1 --> 1
c    (-b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧ -p_472) -> (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0)
c  in CNF:
c     b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_2
c     b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_1
c     b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨  b^{2, 237}_0
c  in DIMACS:
 5354 -5355  5356  472 -5357 0
 5354 -5355  5356  472 -5358 0
 5354 -5355  5356  472  5359 0

c  1-1 --> 0
c    (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0 ∧ -p_472) -> (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧ -b^{2, 237}_0)
c  in CNF:
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_2
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_1
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_0
c  in DIMACS:
 5354  5355 -5356  472 -5357 0
 5354  5355 -5356  472 -5358 0
 5354  5355 -5356  472 -5359 0

c  0-1 --> -1
c    (-b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧ -p_472) -> ( b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0)
c  in CNF:
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨  b^{2, 237}_2
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_1
c     b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨  b^{2, 237}_0
c  in DIMACS:
 5354  5355  5356  472  5357 0
 5354  5355  5356  472 -5358 0
 5354  5355  5356  472  5359 0

c  -1-1 --> -2
c    ( b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧  b^{2, 236}_0 ∧ -p_472) -> ( b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0)
c  in CNF:
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨  b^{2, 237}_2
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨  b^{2, 237}_1
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨  p_472 ∨ -b^{2, 237}_0
c  in DIMACS:
-5354  5355 -5356  472  5357 0
-5354  5355 -5356  472  5358 0
-5354  5355 -5356  472 -5359 0

c  -2-1 --> break 
c    ( b^{2, 236}_2 ∧  b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨  b^{2, 236}_0 ∨  p_472 ∨ break
c  in DIMACS:
-5354 -5355  5356  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 236}_2 ∧ -b^{2, 236}_1 ∧ -b^{2, 236}_0 ∧ true) 
c  in CNF:
c    -b^{2, 236}_2 ∨  b^{2, 236}_1 ∨  b^{2, 236}_0 ∨ false 
c  in DIMACS:
-5354  5355  5356  0

c  3 does not represent an automaton state.
c    -(-b^{2, 236}_2 ∧  b^{2, 236}_1 ∧  b^{2, 236}_0 ∧ true) 
c  in CNF:
c     b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ false 
c  in DIMACS:
 5354 -5355 -5356  0
c  -3 does not represent an automaton state.
c    -( b^{2, 236}_2 ∧  b^{2, 236}_1 ∧  b^{2, 236}_0 ∧ true) 
c  in CNF:
c    -b^{2, 236}_2 ∨ -b^{2, 236}_1 ∨ -b^{2, 236}_0 ∨ false 
c  in DIMACS:
-5354 -5355 -5356  0

c i = 237
c  -2+1 --> -1
c    ( b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧  p_474) -> ( b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0)
c  in CNF:
c    -b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨  b^{2, 238}_2
c    -b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_1
c    -b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨  b^{2, 238}_0
c  in DIMACS:
-5357 -5358  5359 -474  5360 0
-5357 -5358  5359 -474 -5361 0
-5357 -5358  5359 -474  5362 0

c  -1+1 --> 0
c    ( b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0 ∧  p_474) -> (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧ -b^{2, 238}_0)
c  in CNF:
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_2
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_1
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_0
c  in DIMACS:
-5357  5358 -5359 -474 -5360 0
-5357  5358 -5359 -474 -5361 0
-5357  5358 -5359 -474 -5362 0

c  0+1 --> 1
c    (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧  p_474) -> (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0)
c  in CNF:
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_2
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_1
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨  b^{2, 238}_0
c  in DIMACS:
 5357  5358  5359 -474 -5360 0
 5357  5358  5359 -474 -5361 0
 5357  5358  5359 -474  5362 0

c  1+1 --> 2
c    (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0 ∧  p_474) -> (-b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0)
c  in CNF:
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_2
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨  b^{2, 238}_1
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ -p_474 ∨ -b^{2, 238}_0
c  in DIMACS:
 5357  5358 -5359 -474 -5360 0
 5357  5358 -5359 -474  5361 0
 5357  5358 -5359 -474 -5362 0

c  2+1 --> break 
c    (-b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧  p_474) -> break
c  in CNF:
c     b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 5357 -5358  5359 -474 1162 0


c  2-1 --> 1
c    (-b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧ -p_474) -> (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0)
c  in CNF:
c     b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_2
c     b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_1
c     b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨  b^{2, 238}_0
c  in DIMACS:
 5357 -5358  5359  474 -5360 0
 5357 -5358  5359  474 -5361 0
 5357 -5358  5359  474  5362 0

c  1-1 --> 0
c    (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0 ∧ -p_474) -> (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧ -b^{2, 238}_0)
c  in CNF:
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_2
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_1
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_0
c  in DIMACS:
 5357  5358 -5359  474 -5360 0
 5357  5358 -5359  474 -5361 0
 5357  5358 -5359  474 -5362 0

c  0-1 --> -1
c    (-b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧ -p_474) -> ( b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0)
c  in CNF:
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨  b^{2, 238}_2
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_1
c     b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨  b^{2, 238}_0
c  in DIMACS:
 5357  5358  5359  474  5360 0
 5357  5358  5359  474 -5361 0
 5357  5358  5359  474  5362 0

c  -1-1 --> -2
c    ( b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧  b^{2, 237}_0 ∧ -p_474) -> ( b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0)
c  in CNF:
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨  b^{2, 238}_2
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨  b^{2, 238}_1
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨  p_474 ∨ -b^{2, 238}_0
c  in DIMACS:
-5357  5358 -5359  474  5360 0
-5357  5358 -5359  474  5361 0
-5357  5358 -5359  474 -5362 0

c  -2-1 --> break 
c    ( b^{2, 237}_2 ∧  b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨  b^{2, 237}_0 ∨  p_474 ∨ break
c  in DIMACS:
-5357 -5358  5359  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 237}_2 ∧ -b^{2, 237}_1 ∧ -b^{2, 237}_0 ∧ true) 
c  in CNF:
c    -b^{2, 237}_2 ∨  b^{2, 237}_1 ∨  b^{2, 237}_0 ∨ false 
c  in DIMACS:
-5357  5358  5359  0

c  3 does not represent an automaton state.
c    -(-b^{2, 237}_2 ∧  b^{2, 237}_1 ∧  b^{2, 237}_0 ∧ true) 
c  in CNF:
c     b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ false 
c  in DIMACS:
 5357 -5358 -5359  0
c  -3 does not represent an automaton state.
c    -( b^{2, 237}_2 ∧  b^{2, 237}_1 ∧  b^{2, 237}_0 ∧ true) 
c  in CNF:
c    -b^{2, 237}_2 ∨ -b^{2, 237}_1 ∨ -b^{2, 237}_0 ∨ false 
c  in DIMACS:
-5357 -5358 -5359  0

c i = 238
c  -2+1 --> -1
c    ( b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧  p_476) -> ( b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0)
c  in CNF:
c    -b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨  b^{2, 239}_2
c    -b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_1
c    -b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨  b^{2, 239}_0
c  in DIMACS:
-5360 -5361  5362 -476  5363 0
-5360 -5361  5362 -476 -5364 0
-5360 -5361  5362 -476  5365 0

c  -1+1 --> 0
c    ( b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0 ∧  p_476) -> (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧ -b^{2, 239}_0)
c  in CNF:
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_2
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_1
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_0
c  in DIMACS:
-5360  5361 -5362 -476 -5363 0
-5360  5361 -5362 -476 -5364 0
-5360  5361 -5362 -476 -5365 0

c  0+1 --> 1
c    (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧  p_476) -> (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0)
c  in CNF:
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_2
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_1
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨  b^{2, 239}_0
c  in DIMACS:
 5360  5361  5362 -476 -5363 0
 5360  5361  5362 -476 -5364 0
 5360  5361  5362 -476  5365 0

c  1+1 --> 2
c    (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0 ∧  p_476) -> (-b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0)
c  in CNF:
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_2
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨  b^{2, 239}_1
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ -p_476 ∨ -b^{2, 239}_0
c  in DIMACS:
 5360  5361 -5362 -476 -5363 0
 5360  5361 -5362 -476  5364 0
 5360  5361 -5362 -476 -5365 0

c  2+1 --> break 
c    (-b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧  p_476) -> break
c  in CNF:
c     b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 5360 -5361  5362 -476 1162 0


c  2-1 --> 1
c    (-b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧ -p_476) -> (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0)
c  in CNF:
c     b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_2
c     b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_1
c     b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨  b^{2, 239}_0
c  in DIMACS:
 5360 -5361  5362  476 -5363 0
 5360 -5361  5362  476 -5364 0
 5360 -5361  5362  476  5365 0

c  1-1 --> 0
c    (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0 ∧ -p_476) -> (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧ -b^{2, 239}_0)
c  in CNF:
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_2
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_1
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_0
c  in DIMACS:
 5360  5361 -5362  476 -5363 0
 5360  5361 -5362  476 -5364 0
 5360  5361 -5362  476 -5365 0

c  0-1 --> -1
c    (-b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧ -p_476) -> ( b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0)
c  in CNF:
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨  b^{2, 239}_2
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_1
c     b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨  b^{2, 239}_0
c  in DIMACS:
 5360  5361  5362  476  5363 0
 5360  5361  5362  476 -5364 0
 5360  5361  5362  476  5365 0

c  -1-1 --> -2
c    ( b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧  b^{2, 238}_0 ∧ -p_476) -> ( b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0)
c  in CNF:
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨  b^{2, 239}_2
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨  b^{2, 239}_1
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨  p_476 ∨ -b^{2, 239}_0
c  in DIMACS:
-5360  5361 -5362  476  5363 0
-5360  5361 -5362  476  5364 0
-5360  5361 -5362  476 -5365 0

c  -2-1 --> break 
c    ( b^{2, 238}_2 ∧  b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨  b^{2, 238}_0 ∨  p_476 ∨ break
c  in DIMACS:
-5360 -5361  5362  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 238}_2 ∧ -b^{2, 238}_1 ∧ -b^{2, 238}_0 ∧ true) 
c  in CNF:
c    -b^{2, 238}_2 ∨  b^{2, 238}_1 ∨  b^{2, 238}_0 ∨ false 
c  in DIMACS:
-5360  5361  5362  0

c  3 does not represent an automaton state.
c    -(-b^{2, 238}_2 ∧  b^{2, 238}_1 ∧  b^{2, 238}_0 ∧ true) 
c  in CNF:
c     b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ false 
c  in DIMACS:
 5360 -5361 -5362  0
c  -3 does not represent an automaton state.
c    -( b^{2, 238}_2 ∧  b^{2, 238}_1 ∧  b^{2, 238}_0 ∧ true) 
c  in CNF:
c    -b^{2, 238}_2 ∨ -b^{2, 238}_1 ∨ -b^{2, 238}_0 ∨ false 
c  in DIMACS:
-5360 -5361 -5362  0

c i = 239
c  -2+1 --> -1
c    ( b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧  p_478) -> ( b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0)
c  in CNF:
c    -b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨  b^{2, 240}_2
c    -b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_1
c    -b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨  b^{2, 240}_0
c  in DIMACS:
-5363 -5364  5365 -478  5366 0
-5363 -5364  5365 -478 -5367 0
-5363 -5364  5365 -478  5368 0

c  -1+1 --> 0
c    ( b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0 ∧  p_478) -> (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧ -b^{2, 240}_0)
c  in CNF:
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_2
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_1
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_0
c  in DIMACS:
-5363  5364 -5365 -478 -5366 0
-5363  5364 -5365 -478 -5367 0
-5363  5364 -5365 -478 -5368 0

c  0+1 --> 1
c    (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧  p_478) -> (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0)
c  in CNF:
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_2
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_1
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨  b^{2, 240}_0
c  in DIMACS:
 5363  5364  5365 -478 -5366 0
 5363  5364  5365 -478 -5367 0
 5363  5364  5365 -478  5368 0

c  1+1 --> 2
c    (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0 ∧  p_478) -> (-b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0)
c  in CNF:
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_2
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨  b^{2, 240}_1
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ -p_478 ∨ -b^{2, 240}_0
c  in DIMACS:
 5363  5364 -5365 -478 -5366 0
 5363  5364 -5365 -478  5367 0
 5363  5364 -5365 -478 -5368 0

c  2+1 --> break 
c    (-b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧  p_478) -> break
c  in CNF:
c     b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ -p_478 ∨ break
c  in DIMACS:
 5363 -5364  5365 -478 1162 0


c  2-1 --> 1
c    (-b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧ -p_478) -> (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0)
c  in CNF:
c     b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_2
c     b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_1
c     b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨  b^{2, 240}_0
c  in DIMACS:
 5363 -5364  5365  478 -5366 0
 5363 -5364  5365  478 -5367 0
 5363 -5364  5365  478  5368 0

c  1-1 --> 0
c    (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0 ∧ -p_478) -> (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧ -b^{2, 240}_0)
c  in CNF:
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_2
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_1
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_0
c  in DIMACS:
 5363  5364 -5365  478 -5366 0
 5363  5364 -5365  478 -5367 0
 5363  5364 -5365  478 -5368 0

c  0-1 --> -1
c    (-b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧ -p_478) -> ( b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0)
c  in CNF:
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨  b^{2, 240}_2
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_1
c     b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨  b^{2, 240}_0
c  in DIMACS:
 5363  5364  5365  478  5366 0
 5363  5364  5365  478 -5367 0
 5363  5364  5365  478  5368 0

c  -1-1 --> -2
c    ( b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧  b^{2, 239}_0 ∧ -p_478) -> ( b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0)
c  in CNF:
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨  b^{2, 240}_2
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨  b^{2, 240}_1
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨  p_478 ∨ -b^{2, 240}_0
c  in DIMACS:
-5363  5364 -5365  478  5366 0
-5363  5364 -5365  478  5367 0
-5363  5364 -5365  478 -5368 0

c  -2-1 --> break 
c    ( b^{2, 239}_2 ∧  b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧ -p_478) -> break
c  in CNF:
c    -b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨  b^{2, 239}_0 ∨  p_478 ∨ break
c  in DIMACS:
-5363 -5364  5365  478 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 239}_2 ∧ -b^{2, 239}_1 ∧ -b^{2, 239}_0 ∧ true) 
c  in CNF:
c    -b^{2, 239}_2 ∨  b^{2, 239}_1 ∨  b^{2, 239}_0 ∨ false 
c  in DIMACS:
-5363  5364  5365  0

c  3 does not represent an automaton state.
c    -(-b^{2, 239}_2 ∧  b^{2, 239}_1 ∧  b^{2, 239}_0 ∧ true) 
c  in CNF:
c     b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ false 
c  in DIMACS:
 5363 -5364 -5365  0
c  -3 does not represent an automaton state.
c    -( b^{2, 239}_2 ∧  b^{2, 239}_1 ∧  b^{2, 239}_0 ∧ true) 
c  in CNF:
c    -b^{2, 239}_2 ∨ -b^{2, 239}_1 ∨ -b^{2, 239}_0 ∨ false 
c  in DIMACS:
-5363 -5364 -5365  0

c i = 240
c  -2+1 --> -1
c    ( b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧  p_480) -> ( b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0)
c  in CNF:
c    -b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨  b^{2, 241}_2
c    -b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_1
c    -b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨  b^{2, 241}_0
c  in DIMACS:
-5366 -5367  5368 -480  5369 0
-5366 -5367  5368 -480 -5370 0
-5366 -5367  5368 -480  5371 0

c  -1+1 --> 0
c    ( b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0 ∧  p_480) -> (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧ -b^{2, 241}_0)
c  in CNF:
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_2
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_1
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_0
c  in DIMACS:
-5366  5367 -5368 -480 -5369 0
-5366  5367 -5368 -480 -5370 0
-5366  5367 -5368 -480 -5371 0

c  0+1 --> 1
c    (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧  p_480) -> (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0)
c  in CNF:
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_2
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_1
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨  b^{2, 241}_0
c  in DIMACS:
 5366  5367  5368 -480 -5369 0
 5366  5367  5368 -480 -5370 0
 5366  5367  5368 -480  5371 0

c  1+1 --> 2
c    (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0 ∧  p_480) -> (-b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0)
c  in CNF:
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_2
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨  b^{2, 241}_1
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ -p_480 ∨ -b^{2, 241}_0
c  in DIMACS:
 5366  5367 -5368 -480 -5369 0
 5366  5367 -5368 -480  5370 0
 5366  5367 -5368 -480 -5371 0

c  2+1 --> break 
c    (-b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧  p_480) -> break
c  in CNF:
c     b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 5366 -5367  5368 -480 1162 0


c  2-1 --> 1
c    (-b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧ -p_480) -> (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0)
c  in CNF:
c     b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_2
c     b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_1
c     b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨  b^{2, 241}_0
c  in DIMACS:
 5366 -5367  5368  480 -5369 0
 5366 -5367  5368  480 -5370 0
 5366 -5367  5368  480  5371 0

c  1-1 --> 0
c    (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0 ∧ -p_480) -> (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧ -b^{2, 241}_0)
c  in CNF:
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_2
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_1
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_0
c  in DIMACS:
 5366  5367 -5368  480 -5369 0
 5366  5367 -5368  480 -5370 0
 5366  5367 -5368  480 -5371 0

c  0-1 --> -1
c    (-b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧ -p_480) -> ( b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0)
c  in CNF:
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨  b^{2, 241}_2
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_1
c     b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨  b^{2, 241}_0
c  in DIMACS:
 5366  5367  5368  480  5369 0
 5366  5367  5368  480 -5370 0
 5366  5367  5368  480  5371 0

c  -1-1 --> -2
c    ( b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧  b^{2, 240}_0 ∧ -p_480) -> ( b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0)
c  in CNF:
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨  b^{2, 241}_2
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨  b^{2, 241}_1
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨  p_480 ∨ -b^{2, 241}_0
c  in DIMACS:
-5366  5367 -5368  480  5369 0
-5366  5367 -5368  480  5370 0
-5366  5367 -5368  480 -5371 0

c  -2-1 --> break 
c    ( b^{2, 240}_2 ∧  b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨  b^{2, 240}_0 ∨  p_480 ∨ break
c  in DIMACS:
-5366 -5367  5368  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 240}_2 ∧ -b^{2, 240}_1 ∧ -b^{2, 240}_0 ∧ true) 
c  in CNF:
c    -b^{2, 240}_2 ∨  b^{2, 240}_1 ∨  b^{2, 240}_0 ∨ false 
c  in DIMACS:
-5366  5367  5368  0

c  3 does not represent an automaton state.
c    -(-b^{2, 240}_2 ∧  b^{2, 240}_1 ∧  b^{2, 240}_0 ∧ true) 
c  in CNF:
c     b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ false 
c  in DIMACS:
 5366 -5367 -5368  0
c  -3 does not represent an automaton state.
c    -( b^{2, 240}_2 ∧  b^{2, 240}_1 ∧  b^{2, 240}_0 ∧ true) 
c  in CNF:
c    -b^{2, 240}_2 ∨ -b^{2, 240}_1 ∨ -b^{2, 240}_0 ∨ false 
c  in DIMACS:
-5366 -5367 -5368  0

c i = 241
c  -2+1 --> -1
c    ( b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧  p_482) -> ( b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0)
c  in CNF:
c    -b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨  b^{2, 242}_2
c    -b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_1
c    -b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨  b^{2, 242}_0
c  in DIMACS:
-5369 -5370  5371 -482  5372 0
-5369 -5370  5371 -482 -5373 0
-5369 -5370  5371 -482  5374 0

c  -1+1 --> 0
c    ( b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0 ∧  p_482) -> (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧ -b^{2, 242}_0)
c  in CNF:
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_2
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_1
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_0
c  in DIMACS:
-5369  5370 -5371 -482 -5372 0
-5369  5370 -5371 -482 -5373 0
-5369  5370 -5371 -482 -5374 0

c  0+1 --> 1
c    (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧  p_482) -> (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0)
c  in CNF:
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_2
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_1
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨  b^{2, 242}_0
c  in DIMACS:
 5369  5370  5371 -482 -5372 0
 5369  5370  5371 -482 -5373 0
 5369  5370  5371 -482  5374 0

c  1+1 --> 2
c    (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0 ∧  p_482) -> (-b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0)
c  in CNF:
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_2
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨  b^{2, 242}_1
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ -p_482 ∨ -b^{2, 242}_0
c  in DIMACS:
 5369  5370 -5371 -482 -5372 0
 5369  5370 -5371 -482  5373 0
 5369  5370 -5371 -482 -5374 0

c  2+1 --> break 
c    (-b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧  p_482) -> break
c  in CNF:
c     b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ -p_482 ∨ break
c  in DIMACS:
 5369 -5370  5371 -482 1162 0


c  2-1 --> 1
c    (-b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧ -p_482) -> (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0)
c  in CNF:
c     b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_2
c     b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_1
c     b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨  b^{2, 242}_0
c  in DIMACS:
 5369 -5370  5371  482 -5372 0
 5369 -5370  5371  482 -5373 0
 5369 -5370  5371  482  5374 0

c  1-1 --> 0
c    (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0 ∧ -p_482) -> (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧ -b^{2, 242}_0)
c  in CNF:
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_2
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_1
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_0
c  in DIMACS:
 5369  5370 -5371  482 -5372 0
 5369  5370 -5371  482 -5373 0
 5369  5370 -5371  482 -5374 0

c  0-1 --> -1
c    (-b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧ -p_482) -> ( b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0)
c  in CNF:
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨  b^{2, 242}_2
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_1
c     b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨  b^{2, 242}_0
c  in DIMACS:
 5369  5370  5371  482  5372 0
 5369  5370  5371  482 -5373 0
 5369  5370  5371  482  5374 0

c  -1-1 --> -2
c    ( b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧  b^{2, 241}_0 ∧ -p_482) -> ( b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0)
c  in CNF:
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨  b^{2, 242}_2
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨  b^{2, 242}_1
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨  p_482 ∨ -b^{2, 242}_0
c  in DIMACS:
-5369  5370 -5371  482  5372 0
-5369  5370 -5371  482  5373 0
-5369  5370 -5371  482 -5374 0

c  -2-1 --> break 
c    ( b^{2, 241}_2 ∧  b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧ -p_482) -> break
c  in CNF:
c    -b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨  b^{2, 241}_0 ∨  p_482 ∨ break
c  in DIMACS:
-5369 -5370  5371  482 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 241}_2 ∧ -b^{2, 241}_1 ∧ -b^{2, 241}_0 ∧ true) 
c  in CNF:
c    -b^{2, 241}_2 ∨  b^{2, 241}_1 ∨  b^{2, 241}_0 ∨ false 
c  in DIMACS:
-5369  5370  5371  0

c  3 does not represent an automaton state.
c    -(-b^{2, 241}_2 ∧  b^{2, 241}_1 ∧  b^{2, 241}_0 ∧ true) 
c  in CNF:
c     b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ false 
c  in DIMACS:
 5369 -5370 -5371  0
c  -3 does not represent an automaton state.
c    -( b^{2, 241}_2 ∧  b^{2, 241}_1 ∧  b^{2, 241}_0 ∧ true) 
c  in CNF:
c    -b^{2, 241}_2 ∨ -b^{2, 241}_1 ∨ -b^{2, 241}_0 ∨ false 
c  in DIMACS:
-5369 -5370 -5371  0

c i = 242
c  -2+1 --> -1
c    ( b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧  p_484) -> ( b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0)
c  in CNF:
c    -b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨  b^{2, 243}_2
c    -b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_1
c    -b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨  b^{2, 243}_0
c  in DIMACS:
-5372 -5373  5374 -484  5375 0
-5372 -5373  5374 -484 -5376 0
-5372 -5373  5374 -484  5377 0

c  -1+1 --> 0
c    ( b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0 ∧  p_484) -> (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧ -b^{2, 243}_0)
c  in CNF:
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_2
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_1
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_0
c  in DIMACS:
-5372  5373 -5374 -484 -5375 0
-5372  5373 -5374 -484 -5376 0
-5372  5373 -5374 -484 -5377 0

c  0+1 --> 1
c    (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧  p_484) -> (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0)
c  in CNF:
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_2
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_1
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨  b^{2, 243}_0
c  in DIMACS:
 5372  5373  5374 -484 -5375 0
 5372  5373  5374 -484 -5376 0
 5372  5373  5374 -484  5377 0

c  1+1 --> 2
c    (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0 ∧  p_484) -> (-b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0)
c  in CNF:
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_2
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨  b^{2, 243}_1
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ -p_484 ∨ -b^{2, 243}_0
c  in DIMACS:
 5372  5373 -5374 -484 -5375 0
 5372  5373 -5374 -484  5376 0
 5372  5373 -5374 -484 -5377 0

c  2+1 --> break 
c    (-b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧  p_484) -> break
c  in CNF:
c     b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 5372 -5373  5374 -484 1162 0


c  2-1 --> 1
c    (-b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧ -p_484) -> (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0)
c  in CNF:
c     b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_2
c     b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_1
c     b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨  b^{2, 243}_0
c  in DIMACS:
 5372 -5373  5374  484 -5375 0
 5372 -5373  5374  484 -5376 0
 5372 -5373  5374  484  5377 0

c  1-1 --> 0
c    (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0 ∧ -p_484) -> (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧ -b^{2, 243}_0)
c  in CNF:
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_2
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_1
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_0
c  in DIMACS:
 5372  5373 -5374  484 -5375 0
 5372  5373 -5374  484 -5376 0
 5372  5373 -5374  484 -5377 0

c  0-1 --> -1
c    (-b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧ -p_484) -> ( b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0)
c  in CNF:
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨  b^{2, 243}_2
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_1
c     b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨  b^{2, 243}_0
c  in DIMACS:
 5372  5373  5374  484  5375 0
 5372  5373  5374  484 -5376 0
 5372  5373  5374  484  5377 0

c  -1-1 --> -2
c    ( b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧  b^{2, 242}_0 ∧ -p_484) -> ( b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0)
c  in CNF:
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨  b^{2, 243}_2
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨  b^{2, 243}_1
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨  p_484 ∨ -b^{2, 243}_0
c  in DIMACS:
-5372  5373 -5374  484  5375 0
-5372  5373 -5374  484  5376 0
-5372  5373 -5374  484 -5377 0

c  -2-1 --> break 
c    ( b^{2, 242}_2 ∧  b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨  b^{2, 242}_0 ∨  p_484 ∨ break
c  in DIMACS:
-5372 -5373  5374  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 242}_2 ∧ -b^{2, 242}_1 ∧ -b^{2, 242}_0 ∧ true) 
c  in CNF:
c    -b^{2, 242}_2 ∨  b^{2, 242}_1 ∨  b^{2, 242}_0 ∨ false 
c  in DIMACS:
-5372  5373  5374  0

c  3 does not represent an automaton state.
c    -(-b^{2, 242}_2 ∧  b^{2, 242}_1 ∧  b^{2, 242}_0 ∧ true) 
c  in CNF:
c     b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ false 
c  in DIMACS:
 5372 -5373 -5374  0
c  -3 does not represent an automaton state.
c    -( b^{2, 242}_2 ∧  b^{2, 242}_1 ∧  b^{2, 242}_0 ∧ true) 
c  in CNF:
c    -b^{2, 242}_2 ∨ -b^{2, 242}_1 ∨ -b^{2, 242}_0 ∨ false 
c  in DIMACS:
-5372 -5373 -5374  0

c i = 243
c  -2+1 --> -1
c    ( b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧  p_486) -> ( b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0)
c  in CNF:
c    -b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨  b^{2, 244}_2
c    -b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_1
c    -b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨  b^{2, 244}_0
c  in DIMACS:
-5375 -5376  5377 -486  5378 0
-5375 -5376  5377 -486 -5379 0
-5375 -5376  5377 -486  5380 0

c  -1+1 --> 0
c    ( b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0 ∧  p_486) -> (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧ -b^{2, 244}_0)
c  in CNF:
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_2
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_1
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_0
c  in DIMACS:
-5375  5376 -5377 -486 -5378 0
-5375  5376 -5377 -486 -5379 0
-5375  5376 -5377 -486 -5380 0

c  0+1 --> 1
c    (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧  p_486) -> (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0)
c  in CNF:
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_2
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_1
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨  b^{2, 244}_0
c  in DIMACS:
 5375  5376  5377 -486 -5378 0
 5375  5376  5377 -486 -5379 0
 5375  5376  5377 -486  5380 0

c  1+1 --> 2
c    (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0 ∧  p_486) -> (-b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0)
c  in CNF:
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_2
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨  b^{2, 244}_1
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ -p_486 ∨ -b^{2, 244}_0
c  in DIMACS:
 5375  5376 -5377 -486 -5378 0
 5375  5376 -5377 -486  5379 0
 5375  5376 -5377 -486 -5380 0

c  2+1 --> break 
c    (-b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧  p_486) -> break
c  in CNF:
c     b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 5375 -5376  5377 -486 1162 0


c  2-1 --> 1
c    (-b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧ -p_486) -> (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0)
c  in CNF:
c     b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_2
c     b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_1
c     b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨  b^{2, 244}_0
c  in DIMACS:
 5375 -5376  5377  486 -5378 0
 5375 -5376  5377  486 -5379 0
 5375 -5376  5377  486  5380 0

c  1-1 --> 0
c    (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0 ∧ -p_486) -> (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧ -b^{2, 244}_0)
c  in CNF:
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_2
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_1
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_0
c  in DIMACS:
 5375  5376 -5377  486 -5378 0
 5375  5376 -5377  486 -5379 0
 5375  5376 -5377  486 -5380 0

c  0-1 --> -1
c    (-b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧ -p_486) -> ( b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0)
c  in CNF:
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨  b^{2, 244}_2
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_1
c     b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨  b^{2, 244}_0
c  in DIMACS:
 5375  5376  5377  486  5378 0
 5375  5376  5377  486 -5379 0
 5375  5376  5377  486  5380 0

c  -1-1 --> -2
c    ( b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧  b^{2, 243}_0 ∧ -p_486) -> ( b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0)
c  in CNF:
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨  b^{2, 244}_2
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨  b^{2, 244}_1
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨  p_486 ∨ -b^{2, 244}_0
c  in DIMACS:
-5375  5376 -5377  486  5378 0
-5375  5376 -5377  486  5379 0
-5375  5376 -5377  486 -5380 0

c  -2-1 --> break 
c    ( b^{2, 243}_2 ∧  b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨  b^{2, 243}_0 ∨  p_486 ∨ break
c  in DIMACS:
-5375 -5376  5377  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 243}_2 ∧ -b^{2, 243}_1 ∧ -b^{2, 243}_0 ∧ true) 
c  in CNF:
c    -b^{2, 243}_2 ∨  b^{2, 243}_1 ∨  b^{2, 243}_0 ∨ false 
c  in DIMACS:
-5375  5376  5377  0

c  3 does not represent an automaton state.
c    -(-b^{2, 243}_2 ∧  b^{2, 243}_1 ∧  b^{2, 243}_0 ∧ true) 
c  in CNF:
c     b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ false 
c  in DIMACS:
 5375 -5376 -5377  0
c  -3 does not represent an automaton state.
c    -( b^{2, 243}_2 ∧  b^{2, 243}_1 ∧  b^{2, 243}_0 ∧ true) 
c  in CNF:
c    -b^{2, 243}_2 ∨ -b^{2, 243}_1 ∨ -b^{2, 243}_0 ∨ false 
c  in DIMACS:
-5375 -5376 -5377  0

c i = 244
c  -2+1 --> -1
c    ( b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧  p_488) -> ( b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0)
c  in CNF:
c    -b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨  b^{2, 245}_2
c    -b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_1
c    -b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨  b^{2, 245}_0
c  in DIMACS:
-5378 -5379  5380 -488  5381 0
-5378 -5379  5380 -488 -5382 0
-5378 -5379  5380 -488  5383 0

c  -1+1 --> 0
c    ( b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0 ∧  p_488) -> (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧ -b^{2, 245}_0)
c  in CNF:
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_2
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_1
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_0
c  in DIMACS:
-5378  5379 -5380 -488 -5381 0
-5378  5379 -5380 -488 -5382 0
-5378  5379 -5380 -488 -5383 0

c  0+1 --> 1
c    (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧  p_488) -> (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0)
c  in CNF:
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_2
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_1
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨  b^{2, 245}_0
c  in DIMACS:
 5378  5379  5380 -488 -5381 0
 5378  5379  5380 -488 -5382 0
 5378  5379  5380 -488  5383 0

c  1+1 --> 2
c    (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0 ∧  p_488) -> (-b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0)
c  in CNF:
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_2
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨  b^{2, 245}_1
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ -p_488 ∨ -b^{2, 245}_0
c  in DIMACS:
 5378  5379 -5380 -488 -5381 0
 5378  5379 -5380 -488  5382 0
 5378  5379 -5380 -488 -5383 0

c  2+1 --> break 
c    (-b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧  p_488) -> break
c  in CNF:
c     b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 5378 -5379  5380 -488 1162 0


c  2-1 --> 1
c    (-b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧ -p_488) -> (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0)
c  in CNF:
c     b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_2
c     b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_1
c     b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨  b^{2, 245}_0
c  in DIMACS:
 5378 -5379  5380  488 -5381 0
 5378 -5379  5380  488 -5382 0
 5378 -5379  5380  488  5383 0

c  1-1 --> 0
c    (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0 ∧ -p_488) -> (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧ -b^{2, 245}_0)
c  in CNF:
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_2
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_1
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_0
c  in DIMACS:
 5378  5379 -5380  488 -5381 0
 5378  5379 -5380  488 -5382 0
 5378  5379 -5380  488 -5383 0

c  0-1 --> -1
c    (-b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧ -p_488) -> ( b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0)
c  in CNF:
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨  b^{2, 245}_2
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_1
c     b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨  b^{2, 245}_0
c  in DIMACS:
 5378  5379  5380  488  5381 0
 5378  5379  5380  488 -5382 0
 5378  5379  5380  488  5383 0

c  -1-1 --> -2
c    ( b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧  b^{2, 244}_0 ∧ -p_488) -> ( b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0)
c  in CNF:
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨  b^{2, 245}_2
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨  b^{2, 245}_1
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨  p_488 ∨ -b^{2, 245}_0
c  in DIMACS:
-5378  5379 -5380  488  5381 0
-5378  5379 -5380  488  5382 0
-5378  5379 -5380  488 -5383 0

c  -2-1 --> break 
c    ( b^{2, 244}_2 ∧  b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨  b^{2, 244}_0 ∨  p_488 ∨ break
c  in DIMACS:
-5378 -5379  5380  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 244}_2 ∧ -b^{2, 244}_1 ∧ -b^{2, 244}_0 ∧ true) 
c  in CNF:
c    -b^{2, 244}_2 ∨  b^{2, 244}_1 ∨  b^{2, 244}_0 ∨ false 
c  in DIMACS:
-5378  5379  5380  0

c  3 does not represent an automaton state.
c    -(-b^{2, 244}_2 ∧  b^{2, 244}_1 ∧  b^{2, 244}_0 ∧ true) 
c  in CNF:
c     b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ false 
c  in DIMACS:
 5378 -5379 -5380  0
c  -3 does not represent an automaton state.
c    -( b^{2, 244}_2 ∧  b^{2, 244}_1 ∧  b^{2, 244}_0 ∧ true) 
c  in CNF:
c    -b^{2, 244}_2 ∨ -b^{2, 244}_1 ∨ -b^{2, 244}_0 ∨ false 
c  in DIMACS:
-5378 -5379 -5380  0

c i = 245
c  -2+1 --> -1
c    ( b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧  p_490) -> ( b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0)
c  in CNF:
c    -b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨  b^{2, 246}_2
c    -b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_1
c    -b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨  b^{2, 246}_0
c  in DIMACS:
-5381 -5382  5383 -490  5384 0
-5381 -5382  5383 -490 -5385 0
-5381 -5382  5383 -490  5386 0

c  -1+1 --> 0
c    ( b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0 ∧  p_490) -> (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧ -b^{2, 246}_0)
c  in CNF:
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_2
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_1
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_0
c  in DIMACS:
-5381  5382 -5383 -490 -5384 0
-5381  5382 -5383 -490 -5385 0
-5381  5382 -5383 -490 -5386 0

c  0+1 --> 1
c    (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧  p_490) -> (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0)
c  in CNF:
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_2
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_1
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨  b^{2, 246}_0
c  in DIMACS:
 5381  5382  5383 -490 -5384 0
 5381  5382  5383 -490 -5385 0
 5381  5382  5383 -490  5386 0

c  1+1 --> 2
c    (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0 ∧  p_490) -> (-b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0)
c  in CNF:
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_2
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨  b^{2, 246}_1
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ -p_490 ∨ -b^{2, 246}_0
c  in DIMACS:
 5381  5382 -5383 -490 -5384 0
 5381  5382 -5383 -490  5385 0
 5381  5382 -5383 -490 -5386 0

c  2+1 --> break 
c    (-b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧  p_490) -> break
c  in CNF:
c     b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 5381 -5382  5383 -490 1162 0


c  2-1 --> 1
c    (-b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧ -p_490) -> (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0)
c  in CNF:
c     b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_2
c     b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_1
c     b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨  b^{2, 246}_0
c  in DIMACS:
 5381 -5382  5383  490 -5384 0
 5381 -5382  5383  490 -5385 0
 5381 -5382  5383  490  5386 0

c  1-1 --> 0
c    (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0 ∧ -p_490) -> (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧ -b^{2, 246}_0)
c  in CNF:
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_2
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_1
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_0
c  in DIMACS:
 5381  5382 -5383  490 -5384 0
 5381  5382 -5383  490 -5385 0
 5381  5382 -5383  490 -5386 0

c  0-1 --> -1
c    (-b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧ -p_490) -> ( b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0)
c  in CNF:
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨  b^{2, 246}_2
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_1
c     b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨  b^{2, 246}_0
c  in DIMACS:
 5381  5382  5383  490  5384 0
 5381  5382  5383  490 -5385 0
 5381  5382  5383  490  5386 0

c  -1-1 --> -2
c    ( b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧  b^{2, 245}_0 ∧ -p_490) -> ( b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0)
c  in CNF:
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨  b^{2, 246}_2
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨  b^{2, 246}_1
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨  p_490 ∨ -b^{2, 246}_0
c  in DIMACS:
-5381  5382 -5383  490  5384 0
-5381  5382 -5383  490  5385 0
-5381  5382 -5383  490 -5386 0

c  -2-1 --> break 
c    ( b^{2, 245}_2 ∧  b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨  b^{2, 245}_0 ∨  p_490 ∨ break
c  in DIMACS:
-5381 -5382  5383  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 245}_2 ∧ -b^{2, 245}_1 ∧ -b^{2, 245}_0 ∧ true) 
c  in CNF:
c    -b^{2, 245}_2 ∨  b^{2, 245}_1 ∨  b^{2, 245}_0 ∨ false 
c  in DIMACS:
-5381  5382  5383  0

c  3 does not represent an automaton state.
c    -(-b^{2, 245}_2 ∧  b^{2, 245}_1 ∧  b^{2, 245}_0 ∧ true) 
c  in CNF:
c     b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ false 
c  in DIMACS:
 5381 -5382 -5383  0
c  -3 does not represent an automaton state.
c    -( b^{2, 245}_2 ∧  b^{2, 245}_1 ∧  b^{2, 245}_0 ∧ true) 
c  in CNF:
c    -b^{2, 245}_2 ∨ -b^{2, 245}_1 ∨ -b^{2, 245}_0 ∨ false 
c  in DIMACS:
-5381 -5382 -5383  0

c i = 246
c  -2+1 --> -1
c    ( b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧  p_492) -> ( b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0)
c  in CNF:
c    -b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨  b^{2, 247}_2
c    -b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_1
c    -b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨  b^{2, 247}_0
c  in DIMACS:
-5384 -5385  5386 -492  5387 0
-5384 -5385  5386 -492 -5388 0
-5384 -5385  5386 -492  5389 0

c  -1+1 --> 0
c    ( b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0 ∧  p_492) -> (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧ -b^{2, 247}_0)
c  in CNF:
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_2
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_1
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_0
c  in DIMACS:
-5384  5385 -5386 -492 -5387 0
-5384  5385 -5386 -492 -5388 0
-5384  5385 -5386 -492 -5389 0

c  0+1 --> 1
c    (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧  p_492) -> (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0)
c  in CNF:
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_2
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_1
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨  b^{2, 247}_0
c  in DIMACS:
 5384  5385  5386 -492 -5387 0
 5384  5385  5386 -492 -5388 0
 5384  5385  5386 -492  5389 0

c  1+1 --> 2
c    (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0 ∧  p_492) -> (-b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0)
c  in CNF:
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_2
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨  b^{2, 247}_1
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ -p_492 ∨ -b^{2, 247}_0
c  in DIMACS:
 5384  5385 -5386 -492 -5387 0
 5384  5385 -5386 -492  5388 0
 5384  5385 -5386 -492 -5389 0

c  2+1 --> break 
c    (-b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧  p_492) -> break
c  in CNF:
c     b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 5384 -5385  5386 -492 1162 0


c  2-1 --> 1
c    (-b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧ -p_492) -> (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0)
c  in CNF:
c     b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_2
c     b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_1
c     b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨  b^{2, 247}_0
c  in DIMACS:
 5384 -5385  5386  492 -5387 0
 5384 -5385  5386  492 -5388 0
 5384 -5385  5386  492  5389 0

c  1-1 --> 0
c    (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0 ∧ -p_492) -> (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧ -b^{2, 247}_0)
c  in CNF:
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_2
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_1
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_0
c  in DIMACS:
 5384  5385 -5386  492 -5387 0
 5384  5385 -5386  492 -5388 0
 5384  5385 -5386  492 -5389 0

c  0-1 --> -1
c    (-b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧ -p_492) -> ( b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0)
c  in CNF:
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨  b^{2, 247}_2
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_1
c     b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨  b^{2, 247}_0
c  in DIMACS:
 5384  5385  5386  492  5387 0
 5384  5385  5386  492 -5388 0
 5384  5385  5386  492  5389 0

c  -1-1 --> -2
c    ( b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧  b^{2, 246}_0 ∧ -p_492) -> ( b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0)
c  in CNF:
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨  b^{2, 247}_2
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨  b^{2, 247}_1
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨  p_492 ∨ -b^{2, 247}_0
c  in DIMACS:
-5384  5385 -5386  492  5387 0
-5384  5385 -5386  492  5388 0
-5384  5385 -5386  492 -5389 0

c  -2-1 --> break 
c    ( b^{2, 246}_2 ∧  b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨  b^{2, 246}_0 ∨  p_492 ∨ break
c  in DIMACS:
-5384 -5385  5386  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 246}_2 ∧ -b^{2, 246}_1 ∧ -b^{2, 246}_0 ∧ true) 
c  in CNF:
c    -b^{2, 246}_2 ∨  b^{2, 246}_1 ∨  b^{2, 246}_0 ∨ false 
c  in DIMACS:
-5384  5385  5386  0

c  3 does not represent an automaton state.
c    -(-b^{2, 246}_2 ∧  b^{2, 246}_1 ∧  b^{2, 246}_0 ∧ true) 
c  in CNF:
c     b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ false 
c  in DIMACS:
 5384 -5385 -5386  0
c  -3 does not represent an automaton state.
c    -( b^{2, 246}_2 ∧  b^{2, 246}_1 ∧  b^{2, 246}_0 ∧ true) 
c  in CNF:
c    -b^{2, 246}_2 ∨ -b^{2, 246}_1 ∨ -b^{2, 246}_0 ∨ false 
c  in DIMACS:
-5384 -5385 -5386  0

c i = 247
c  -2+1 --> -1
c    ( b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧  p_494) -> ( b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0)
c  in CNF:
c    -b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨  b^{2, 248}_2
c    -b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_1
c    -b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨  b^{2, 248}_0
c  in DIMACS:
-5387 -5388  5389 -494  5390 0
-5387 -5388  5389 -494 -5391 0
-5387 -5388  5389 -494  5392 0

c  -1+1 --> 0
c    ( b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0 ∧  p_494) -> (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧ -b^{2, 248}_0)
c  in CNF:
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_2
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_1
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_0
c  in DIMACS:
-5387  5388 -5389 -494 -5390 0
-5387  5388 -5389 -494 -5391 0
-5387  5388 -5389 -494 -5392 0

c  0+1 --> 1
c    (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧  p_494) -> (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0)
c  in CNF:
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_2
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_1
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨  b^{2, 248}_0
c  in DIMACS:
 5387  5388  5389 -494 -5390 0
 5387  5388  5389 -494 -5391 0
 5387  5388  5389 -494  5392 0

c  1+1 --> 2
c    (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0 ∧  p_494) -> (-b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0)
c  in CNF:
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_2
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨  b^{2, 248}_1
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ -p_494 ∨ -b^{2, 248}_0
c  in DIMACS:
 5387  5388 -5389 -494 -5390 0
 5387  5388 -5389 -494  5391 0
 5387  5388 -5389 -494 -5392 0

c  2+1 --> break 
c    (-b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧  p_494) -> break
c  in CNF:
c     b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 5387 -5388  5389 -494 1162 0


c  2-1 --> 1
c    (-b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧ -p_494) -> (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0)
c  in CNF:
c     b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_2
c     b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_1
c     b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨  b^{2, 248}_0
c  in DIMACS:
 5387 -5388  5389  494 -5390 0
 5387 -5388  5389  494 -5391 0
 5387 -5388  5389  494  5392 0

c  1-1 --> 0
c    (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0 ∧ -p_494) -> (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧ -b^{2, 248}_0)
c  in CNF:
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_2
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_1
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_0
c  in DIMACS:
 5387  5388 -5389  494 -5390 0
 5387  5388 -5389  494 -5391 0
 5387  5388 -5389  494 -5392 0

c  0-1 --> -1
c    (-b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧ -p_494) -> ( b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0)
c  in CNF:
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨  b^{2, 248}_2
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_1
c     b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨  b^{2, 248}_0
c  in DIMACS:
 5387  5388  5389  494  5390 0
 5387  5388  5389  494 -5391 0
 5387  5388  5389  494  5392 0

c  -1-1 --> -2
c    ( b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧  b^{2, 247}_0 ∧ -p_494) -> ( b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0)
c  in CNF:
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨  b^{2, 248}_2
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨  b^{2, 248}_1
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨  p_494 ∨ -b^{2, 248}_0
c  in DIMACS:
-5387  5388 -5389  494  5390 0
-5387  5388 -5389  494  5391 0
-5387  5388 -5389  494 -5392 0

c  -2-1 --> break 
c    ( b^{2, 247}_2 ∧  b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨  b^{2, 247}_0 ∨  p_494 ∨ break
c  in DIMACS:
-5387 -5388  5389  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 247}_2 ∧ -b^{2, 247}_1 ∧ -b^{2, 247}_0 ∧ true) 
c  in CNF:
c    -b^{2, 247}_2 ∨  b^{2, 247}_1 ∨  b^{2, 247}_0 ∨ false 
c  in DIMACS:
-5387  5388  5389  0

c  3 does not represent an automaton state.
c    -(-b^{2, 247}_2 ∧  b^{2, 247}_1 ∧  b^{2, 247}_0 ∧ true) 
c  in CNF:
c     b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ false 
c  in DIMACS:
 5387 -5388 -5389  0
c  -3 does not represent an automaton state.
c    -( b^{2, 247}_2 ∧  b^{2, 247}_1 ∧  b^{2, 247}_0 ∧ true) 
c  in CNF:
c    -b^{2, 247}_2 ∨ -b^{2, 247}_1 ∨ -b^{2, 247}_0 ∨ false 
c  in DIMACS:
-5387 -5388 -5389  0

c i = 248
c  -2+1 --> -1
c    ( b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧  p_496) -> ( b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0)
c  in CNF:
c    -b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨  b^{2, 249}_2
c    -b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_1
c    -b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨  b^{2, 249}_0
c  in DIMACS:
-5390 -5391  5392 -496  5393 0
-5390 -5391  5392 -496 -5394 0
-5390 -5391  5392 -496  5395 0

c  -1+1 --> 0
c    ( b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0 ∧  p_496) -> (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧ -b^{2, 249}_0)
c  in CNF:
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_2
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_1
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_0
c  in DIMACS:
-5390  5391 -5392 -496 -5393 0
-5390  5391 -5392 -496 -5394 0
-5390  5391 -5392 -496 -5395 0

c  0+1 --> 1
c    (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧  p_496) -> (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0)
c  in CNF:
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_2
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_1
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨  b^{2, 249}_0
c  in DIMACS:
 5390  5391  5392 -496 -5393 0
 5390  5391  5392 -496 -5394 0
 5390  5391  5392 -496  5395 0

c  1+1 --> 2
c    (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0 ∧  p_496) -> (-b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0)
c  in CNF:
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_2
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨  b^{2, 249}_1
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ -p_496 ∨ -b^{2, 249}_0
c  in DIMACS:
 5390  5391 -5392 -496 -5393 0
 5390  5391 -5392 -496  5394 0
 5390  5391 -5392 -496 -5395 0

c  2+1 --> break 
c    (-b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧  p_496) -> break
c  in CNF:
c     b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 5390 -5391  5392 -496 1162 0


c  2-1 --> 1
c    (-b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧ -p_496) -> (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0)
c  in CNF:
c     b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_2
c     b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_1
c     b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨  b^{2, 249}_0
c  in DIMACS:
 5390 -5391  5392  496 -5393 0
 5390 -5391  5392  496 -5394 0
 5390 -5391  5392  496  5395 0

c  1-1 --> 0
c    (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0 ∧ -p_496) -> (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧ -b^{2, 249}_0)
c  in CNF:
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_2
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_1
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_0
c  in DIMACS:
 5390  5391 -5392  496 -5393 0
 5390  5391 -5392  496 -5394 0
 5390  5391 -5392  496 -5395 0

c  0-1 --> -1
c    (-b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧ -p_496) -> ( b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0)
c  in CNF:
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨  b^{2, 249}_2
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_1
c     b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨  b^{2, 249}_0
c  in DIMACS:
 5390  5391  5392  496  5393 0
 5390  5391  5392  496 -5394 0
 5390  5391  5392  496  5395 0

c  -1-1 --> -2
c    ( b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧  b^{2, 248}_0 ∧ -p_496) -> ( b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0)
c  in CNF:
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨  b^{2, 249}_2
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨  b^{2, 249}_1
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨  p_496 ∨ -b^{2, 249}_0
c  in DIMACS:
-5390  5391 -5392  496  5393 0
-5390  5391 -5392  496  5394 0
-5390  5391 -5392  496 -5395 0

c  -2-1 --> break 
c    ( b^{2, 248}_2 ∧  b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨  b^{2, 248}_0 ∨  p_496 ∨ break
c  in DIMACS:
-5390 -5391  5392  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 248}_2 ∧ -b^{2, 248}_1 ∧ -b^{2, 248}_0 ∧ true) 
c  in CNF:
c    -b^{2, 248}_2 ∨  b^{2, 248}_1 ∨  b^{2, 248}_0 ∨ false 
c  in DIMACS:
-5390  5391  5392  0

c  3 does not represent an automaton state.
c    -(-b^{2, 248}_2 ∧  b^{2, 248}_1 ∧  b^{2, 248}_0 ∧ true) 
c  in CNF:
c     b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ false 
c  in DIMACS:
 5390 -5391 -5392  0
c  -3 does not represent an automaton state.
c    -( b^{2, 248}_2 ∧  b^{2, 248}_1 ∧  b^{2, 248}_0 ∧ true) 
c  in CNF:
c    -b^{2, 248}_2 ∨ -b^{2, 248}_1 ∨ -b^{2, 248}_0 ∨ false 
c  in DIMACS:
-5390 -5391 -5392  0

c i = 249
c  -2+1 --> -1
c    ( b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧  p_498) -> ( b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0)
c  in CNF:
c    -b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨  b^{2, 250}_2
c    -b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_1
c    -b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨  b^{2, 250}_0
c  in DIMACS:
-5393 -5394  5395 -498  5396 0
-5393 -5394  5395 -498 -5397 0
-5393 -5394  5395 -498  5398 0

c  -1+1 --> 0
c    ( b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0 ∧  p_498) -> (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧ -b^{2, 250}_0)
c  in CNF:
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_2
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_1
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_0
c  in DIMACS:
-5393  5394 -5395 -498 -5396 0
-5393  5394 -5395 -498 -5397 0
-5393  5394 -5395 -498 -5398 0

c  0+1 --> 1
c    (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧  p_498) -> (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0)
c  in CNF:
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_2
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_1
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨  b^{2, 250}_0
c  in DIMACS:
 5393  5394  5395 -498 -5396 0
 5393  5394  5395 -498 -5397 0
 5393  5394  5395 -498  5398 0

c  1+1 --> 2
c    (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0 ∧  p_498) -> (-b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0)
c  in CNF:
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_2
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨  b^{2, 250}_1
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ -p_498 ∨ -b^{2, 250}_0
c  in DIMACS:
 5393  5394 -5395 -498 -5396 0
 5393  5394 -5395 -498  5397 0
 5393  5394 -5395 -498 -5398 0

c  2+1 --> break 
c    (-b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧  p_498) -> break
c  in CNF:
c     b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 5393 -5394  5395 -498 1162 0


c  2-1 --> 1
c    (-b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧ -p_498) -> (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0)
c  in CNF:
c     b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_2
c     b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_1
c     b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨  b^{2, 250}_0
c  in DIMACS:
 5393 -5394  5395  498 -5396 0
 5393 -5394  5395  498 -5397 0
 5393 -5394  5395  498  5398 0

c  1-1 --> 0
c    (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0 ∧ -p_498) -> (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧ -b^{2, 250}_0)
c  in CNF:
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_2
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_1
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_0
c  in DIMACS:
 5393  5394 -5395  498 -5396 0
 5393  5394 -5395  498 -5397 0
 5393  5394 -5395  498 -5398 0

c  0-1 --> -1
c    (-b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧ -p_498) -> ( b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0)
c  in CNF:
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨  b^{2, 250}_2
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_1
c     b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨  b^{2, 250}_0
c  in DIMACS:
 5393  5394  5395  498  5396 0
 5393  5394  5395  498 -5397 0
 5393  5394  5395  498  5398 0

c  -1-1 --> -2
c    ( b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧  b^{2, 249}_0 ∧ -p_498) -> ( b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0)
c  in CNF:
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨  b^{2, 250}_2
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨  b^{2, 250}_1
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨  p_498 ∨ -b^{2, 250}_0
c  in DIMACS:
-5393  5394 -5395  498  5396 0
-5393  5394 -5395  498  5397 0
-5393  5394 -5395  498 -5398 0

c  -2-1 --> break 
c    ( b^{2, 249}_2 ∧  b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨  b^{2, 249}_0 ∨  p_498 ∨ break
c  in DIMACS:
-5393 -5394  5395  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 249}_2 ∧ -b^{2, 249}_1 ∧ -b^{2, 249}_0 ∧ true) 
c  in CNF:
c    -b^{2, 249}_2 ∨  b^{2, 249}_1 ∨  b^{2, 249}_0 ∨ false 
c  in DIMACS:
-5393  5394  5395  0

c  3 does not represent an automaton state.
c    -(-b^{2, 249}_2 ∧  b^{2, 249}_1 ∧  b^{2, 249}_0 ∧ true) 
c  in CNF:
c     b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ false 
c  in DIMACS:
 5393 -5394 -5395  0
c  -3 does not represent an automaton state.
c    -( b^{2, 249}_2 ∧  b^{2, 249}_1 ∧  b^{2, 249}_0 ∧ true) 
c  in CNF:
c    -b^{2, 249}_2 ∨ -b^{2, 249}_1 ∨ -b^{2, 249}_0 ∨ false 
c  in DIMACS:
-5393 -5394 -5395  0

c i = 250
c  -2+1 --> -1
c    ( b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧  p_500) -> ( b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0)
c  in CNF:
c    -b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨  b^{2, 251}_2
c    -b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_1
c    -b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨  b^{2, 251}_0
c  in DIMACS:
-5396 -5397  5398 -500  5399 0
-5396 -5397  5398 -500 -5400 0
-5396 -5397  5398 -500  5401 0

c  -1+1 --> 0
c    ( b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0 ∧  p_500) -> (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧ -b^{2, 251}_0)
c  in CNF:
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_2
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_1
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_0
c  in DIMACS:
-5396  5397 -5398 -500 -5399 0
-5396  5397 -5398 -500 -5400 0
-5396  5397 -5398 -500 -5401 0

c  0+1 --> 1
c    (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧  p_500) -> (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0)
c  in CNF:
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_2
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_1
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨  b^{2, 251}_0
c  in DIMACS:
 5396  5397  5398 -500 -5399 0
 5396  5397  5398 -500 -5400 0
 5396  5397  5398 -500  5401 0

c  1+1 --> 2
c    (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0 ∧  p_500) -> (-b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0)
c  in CNF:
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_2
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨  b^{2, 251}_1
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ -p_500 ∨ -b^{2, 251}_0
c  in DIMACS:
 5396  5397 -5398 -500 -5399 0
 5396  5397 -5398 -500  5400 0
 5396  5397 -5398 -500 -5401 0

c  2+1 --> break 
c    (-b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧  p_500) -> break
c  in CNF:
c     b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 5396 -5397  5398 -500 1162 0


c  2-1 --> 1
c    (-b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧ -p_500) -> (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0)
c  in CNF:
c     b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_2
c     b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_1
c     b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨  b^{2, 251}_0
c  in DIMACS:
 5396 -5397  5398  500 -5399 0
 5396 -5397  5398  500 -5400 0
 5396 -5397  5398  500  5401 0

c  1-1 --> 0
c    (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0 ∧ -p_500) -> (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧ -b^{2, 251}_0)
c  in CNF:
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_2
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_1
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_0
c  in DIMACS:
 5396  5397 -5398  500 -5399 0
 5396  5397 -5398  500 -5400 0
 5396  5397 -5398  500 -5401 0

c  0-1 --> -1
c    (-b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧ -p_500) -> ( b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0)
c  in CNF:
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨  b^{2, 251}_2
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_1
c     b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨  b^{2, 251}_0
c  in DIMACS:
 5396  5397  5398  500  5399 0
 5396  5397  5398  500 -5400 0
 5396  5397  5398  500  5401 0

c  -1-1 --> -2
c    ( b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧  b^{2, 250}_0 ∧ -p_500) -> ( b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0)
c  in CNF:
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨  b^{2, 251}_2
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨  b^{2, 251}_1
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨  p_500 ∨ -b^{2, 251}_0
c  in DIMACS:
-5396  5397 -5398  500  5399 0
-5396  5397 -5398  500  5400 0
-5396  5397 -5398  500 -5401 0

c  -2-1 --> break 
c    ( b^{2, 250}_2 ∧  b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨  b^{2, 250}_0 ∨  p_500 ∨ break
c  in DIMACS:
-5396 -5397  5398  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 250}_2 ∧ -b^{2, 250}_1 ∧ -b^{2, 250}_0 ∧ true) 
c  in CNF:
c    -b^{2, 250}_2 ∨  b^{2, 250}_1 ∨  b^{2, 250}_0 ∨ false 
c  in DIMACS:
-5396  5397  5398  0

c  3 does not represent an automaton state.
c    -(-b^{2, 250}_2 ∧  b^{2, 250}_1 ∧  b^{2, 250}_0 ∧ true) 
c  in CNF:
c     b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ false 
c  in DIMACS:
 5396 -5397 -5398  0
c  -3 does not represent an automaton state.
c    -( b^{2, 250}_2 ∧  b^{2, 250}_1 ∧  b^{2, 250}_0 ∧ true) 
c  in CNF:
c    -b^{2, 250}_2 ∨ -b^{2, 250}_1 ∨ -b^{2, 250}_0 ∨ false 
c  in DIMACS:
-5396 -5397 -5398  0

c i = 251
c  -2+1 --> -1
c    ( b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧  p_502) -> ( b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0)
c  in CNF:
c    -b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨  b^{2, 252}_2
c    -b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_1
c    -b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨  b^{2, 252}_0
c  in DIMACS:
-5399 -5400  5401 -502  5402 0
-5399 -5400  5401 -502 -5403 0
-5399 -5400  5401 -502  5404 0

c  -1+1 --> 0
c    ( b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0 ∧  p_502) -> (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧ -b^{2, 252}_0)
c  in CNF:
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_2
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_1
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_0
c  in DIMACS:
-5399  5400 -5401 -502 -5402 0
-5399  5400 -5401 -502 -5403 0
-5399  5400 -5401 -502 -5404 0

c  0+1 --> 1
c    (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧  p_502) -> (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0)
c  in CNF:
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_2
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_1
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨  b^{2, 252}_0
c  in DIMACS:
 5399  5400  5401 -502 -5402 0
 5399  5400  5401 -502 -5403 0
 5399  5400  5401 -502  5404 0

c  1+1 --> 2
c    (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0 ∧  p_502) -> (-b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0)
c  in CNF:
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_2
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨  b^{2, 252}_1
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ -p_502 ∨ -b^{2, 252}_0
c  in DIMACS:
 5399  5400 -5401 -502 -5402 0
 5399  5400 -5401 -502  5403 0
 5399  5400 -5401 -502 -5404 0

c  2+1 --> break 
c    (-b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧  p_502) -> break
c  in CNF:
c     b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ -p_502 ∨ break
c  in DIMACS:
 5399 -5400  5401 -502 1162 0


c  2-1 --> 1
c    (-b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧ -p_502) -> (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0)
c  in CNF:
c     b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_2
c     b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_1
c     b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨  b^{2, 252}_0
c  in DIMACS:
 5399 -5400  5401  502 -5402 0
 5399 -5400  5401  502 -5403 0
 5399 -5400  5401  502  5404 0

c  1-1 --> 0
c    (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0 ∧ -p_502) -> (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧ -b^{2, 252}_0)
c  in CNF:
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_2
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_1
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_0
c  in DIMACS:
 5399  5400 -5401  502 -5402 0
 5399  5400 -5401  502 -5403 0
 5399  5400 -5401  502 -5404 0

c  0-1 --> -1
c    (-b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧ -p_502) -> ( b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0)
c  in CNF:
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨  b^{2, 252}_2
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_1
c     b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨  b^{2, 252}_0
c  in DIMACS:
 5399  5400  5401  502  5402 0
 5399  5400  5401  502 -5403 0
 5399  5400  5401  502  5404 0

c  -1-1 --> -2
c    ( b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧  b^{2, 251}_0 ∧ -p_502) -> ( b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0)
c  in CNF:
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨  b^{2, 252}_2
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨  b^{2, 252}_1
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨  p_502 ∨ -b^{2, 252}_0
c  in DIMACS:
-5399  5400 -5401  502  5402 0
-5399  5400 -5401  502  5403 0
-5399  5400 -5401  502 -5404 0

c  -2-1 --> break 
c    ( b^{2, 251}_2 ∧  b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧ -p_502) -> break
c  in CNF:
c    -b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨  b^{2, 251}_0 ∨  p_502 ∨ break
c  in DIMACS:
-5399 -5400  5401  502 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 251}_2 ∧ -b^{2, 251}_1 ∧ -b^{2, 251}_0 ∧ true) 
c  in CNF:
c    -b^{2, 251}_2 ∨  b^{2, 251}_1 ∨  b^{2, 251}_0 ∨ false 
c  in DIMACS:
-5399  5400  5401  0

c  3 does not represent an automaton state.
c    -(-b^{2, 251}_2 ∧  b^{2, 251}_1 ∧  b^{2, 251}_0 ∧ true) 
c  in CNF:
c     b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ false 
c  in DIMACS:
 5399 -5400 -5401  0
c  -3 does not represent an automaton state.
c    -( b^{2, 251}_2 ∧  b^{2, 251}_1 ∧  b^{2, 251}_0 ∧ true) 
c  in CNF:
c    -b^{2, 251}_2 ∨ -b^{2, 251}_1 ∨ -b^{2, 251}_0 ∨ false 
c  in DIMACS:
-5399 -5400 -5401  0

c i = 252
c  -2+1 --> -1
c    ( b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧  p_504) -> ( b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0)
c  in CNF:
c    -b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨  b^{2, 253}_2
c    -b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_1
c    -b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨  b^{2, 253}_0
c  in DIMACS:
-5402 -5403  5404 -504  5405 0
-5402 -5403  5404 -504 -5406 0
-5402 -5403  5404 -504  5407 0

c  -1+1 --> 0
c    ( b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0 ∧  p_504) -> (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧ -b^{2, 253}_0)
c  in CNF:
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_2
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_1
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_0
c  in DIMACS:
-5402  5403 -5404 -504 -5405 0
-5402  5403 -5404 -504 -5406 0
-5402  5403 -5404 -504 -5407 0

c  0+1 --> 1
c    (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧  p_504) -> (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0)
c  in CNF:
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_2
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_1
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨  b^{2, 253}_0
c  in DIMACS:
 5402  5403  5404 -504 -5405 0
 5402  5403  5404 -504 -5406 0
 5402  5403  5404 -504  5407 0

c  1+1 --> 2
c    (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0 ∧  p_504) -> (-b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0)
c  in CNF:
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_2
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨  b^{2, 253}_1
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ -p_504 ∨ -b^{2, 253}_0
c  in DIMACS:
 5402  5403 -5404 -504 -5405 0
 5402  5403 -5404 -504  5406 0
 5402  5403 -5404 -504 -5407 0

c  2+1 --> break 
c    (-b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧  p_504) -> break
c  in CNF:
c     b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 5402 -5403  5404 -504 1162 0


c  2-1 --> 1
c    (-b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧ -p_504) -> (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0)
c  in CNF:
c     b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_2
c     b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_1
c     b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨  b^{2, 253}_0
c  in DIMACS:
 5402 -5403  5404  504 -5405 0
 5402 -5403  5404  504 -5406 0
 5402 -5403  5404  504  5407 0

c  1-1 --> 0
c    (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0 ∧ -p_504) -> (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧ -b^{2, 253}_0)
c  in CNF:
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_2
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_1
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_0
c  in DIMACS:
 5402  5403 -5404  504 -5405 0
 5402  5403 -5404  504 -5406 0
 5402  5403 -5404  504 -5407 0

c  0-1 --> -1
c    (-b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧ -p_504) -> ( b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0)
c  in CNF:
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨  b^{2, 253}_2
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_1
c     b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨  b^{2, 253}_0
c  in DIMACS:
 5402  5403  5404  504  5405 0
 5402  5403  5404  504 -5406 0
 5402  5403  5404  504  5407 0

c  -1-1 --> -2
c    ( b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧  b^{2, 252}_0 ∧ -p_504) -> ( b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0)
c  in CNF:
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨  b^{2, 253}_2
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨  b^{2, 253}_1
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨  p_504 ∨ -b^{2, 253}_0
c  in DIMACS:
-5402  5403 -5404  504  5405 0
-5402  5403 -5404  504  5406 0
-5402  5403 -5404  504 -5407 0

c  -2-1 --> break 
c    ( b^{2, 252}_2 ∧  b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨  b^{2, 252}_0 ∨  p_504 ∨ break
c  in DIMACS:
-5402 -5403  5404  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 252}_2 ∧ -b^{2, 252}_1 ∧ -b^{2, 252}_0 ∧ true) 
c  in CNF:
c    -b^{2, 252}_2 ∨  b^{2, 252}_1 ∨  b^{2, 252}_0 ∨ false 
c  in DIMACS:
-5402  5403  5404  0

c  3 does not represent an automaton state.
c    -(-b^{2, 252}_2 ∧  b^{2, 252}_1 ∧  b^{2, 252}_0 ∧ true) 
c  in CNF:
c     b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ false 
c  in DIMACS:
 5402 -5403 -5404  0
c  -3 does not represent an automaton state.
c    -( b^{2, 252}_2 ∧  b^{2, 252}_1 ∧  b^{2, 252}_0 ∧ true) 
c  in CNF:
c    -b^{2, 252}_2 ∨ -b^{2, 252}_1 ∨ -b^{2, 252}_0 ∨ false 
c  in DIMACS:
-5402 -5403 -5404  0

c i = 253
c  -2+1 --> -1
c    ( b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧  p_506) -> ( b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0)
c  in CNF:
c    -b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨  b^{2, 254}_2
c    -b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_1
c    -b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨  b^{2, 254}_0
c  in DIMACS:
-5405 -5406  5407 -506  5408 0
-5405 -5406  5407 -506 -5409 0
-5405 -5406  5407 -506  5410 0

c  -1+1 --> 0
c    ( b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0 ∧  p_506) -> (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧ -b^{2, 254}_0)
c  in CNF:
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_2
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_1
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_0
c  in DIMACS:
-5405  5406 -5407 -506 -5408 0
-5405  5406 -5407 -506 -5409 0
-5405  5406 -5407 -506 -5410 0

c  0+1 --> 1
c    (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧  p_506) -> (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0)
c  in CNF:
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_2
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_1
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨  b^{2, 254}_0
c  in DIMACS:
 5405  5406  5407 -506 -5408 0
 5405  5406  5407 -506 -5409 0
 5405  5406  5407 -506  5410 0

c  1+1 --> 2
c    (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0 ∧  p_506) -> (-b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0)
c  in CNF:
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_2
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨  b^{2, 254}_1
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ -p_506 ∨ -b^{2, 254}_0
c  in DIMACS:
 5405  5406 -5407 -506 -5408 0
 5405  5406 -5407 -506  5409 0
 5405  5406 -5407 -506 -5410 0

c  2+1 --> break 
c    (-b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧  p_506) -> break
c  in CNF:
c     b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 5405 -5406  5407 -506 1162 0


c  2-1 --> 1
c    (-b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧ -p_506) -> (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0)
c  in CNF:
c     b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_2
c     b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_1
c     b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨  b^{2, 254}_0
c  in DIMACS:
 5405 -5406  5407  506 -5408 0
 5405 -5406  5407  506 -5409 0
 5405 -5406  5407  506  5410 0

c  1-1 --> 0
c    (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0 ∧ -p_506) -> (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧ -b^{2, 254}_0)
c  in CNF:
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_2
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_1
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_0
c  in DIMACS:
 5405  5406 -5407  506 -5408 0
 5405  5406 -5407  506 -5409 0
 5405  5406 -5407  506 -5410 0

c  0-1 --> -1
c    (-b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧ -p_506) -> ( b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0)
c  in CNF:
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨  b^{2, 254}_2
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_1
c     b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨  b^{2, 254}_0
c  in DIMACS:
 5405  5406  5407  506  5408 0
 5405  5406  5407  506 -5409 0
 5405  5406  5407  506  5410 0

c  -1-1 --> -2
c    ( b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧  b^{2, 253}_0 ∧ -p_506) -> ( b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0)
c  in CNF:
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨  b^{2, 254}_2
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨  b^{2, 254}_1
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨  p_506 ∨ -b^{2, 254}_0
c  in DIMACS:
-5405  5406 -5407  506  5408 0
-5405  5406 -5407  506  5409 0
-5405  5406 -5407  506 -5410 0

c  -2-1 --> break 
c    ( b^{2, 253}_2 ∧  b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨  b^{2, 253}_0 ∨  p_506 ∨ break
c  in DIMACS:
-5405 -5406  5407  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 253}_2 ∧ -b^{2, 253}_1 ∧ -b^{2, 253}_0 ∧ true) 
c  in CNF:
c    -b^{2, 253}_2 ∨  b^{2, 253}_1 ∨  b^{2, 253}_0 ∨ false 
c  in DIMACS:
-5405  5406  5407  0

c  3 does not represent an automaton state.
c    -(-b^{2, 253}_2 ∧  b^{2, 253}_1 ∧  b^{2, 253}_0 ∧ true) 
c  in CNF:
c     b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ false 
c  in DIMACS:
 5405 -5406 -5407  0
c  -3 does not represent an automaton state.
c    -( b^{2, 253}_2 ∧  b^{2, 253}_1 ∧  b^{2, 253}_0 ∧ true) 
c  in CNF:
c    -b^{2, 253}_2 ∨ -b^{2, 253}_1 ∨ -b^{2, 253}_0 ∨ false 
c  in DIMACS:
-5405 -5406 -5407  0

c i = 254
c  -2+1 --> -1
c    ( b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧  p_508) -> ( b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0)
c  in CNF:
c    -b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨  b^{2, 255}_2
c    -b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_1
c    -b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨  b^{2, 255}_0
c  in DIMACS:
-5408 -5409  5410 -508  5411 0
-5408 -5409  5410 -508 -5412 0
-5408 -5409  5410 -508  5413 0

c  -1+1 --> 0
c    ( b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0 ∧  p_508) -> (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧ -b^{2, 255}_0)
c  in CNF:
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_2
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_1
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_0
c  in DIMACS:
-5408  5409 -5410 -508 -5411 0
-5408  5409 -5410 -508 -5412 0
-5408  5409 -5410 -508 -5413 0

c  0+1 --> 1
c    (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧  p_508) -> (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0)
c  in CNF:
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_2
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_1
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨  b^{2, 255}_0
c  in DIMACS:
 5408  5409  5410 -508 -5411 0
 5408  5409  5410 -508 -5412 0
 5408  5409  5410 -508  5413 0

c  1+1 --> 2
c    (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0 ∧  p_508) -> (-b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0)
c  in CNF:
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_2
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨  b^{2, 255}_1
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ -p_508 ∨ -b^{2, 255}_0
c  in DIMACS:
 5408  5409 -5410 -508 -5411 0
 5408  5409 -5410 -508  5412 0
 5408  5409 -5410 -508 -5413 0

c  2+1 --> break 
c    (-b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧  p_508) -> break
c  in CNF:
c     b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ -p_508 ∨ break
c  in DIMACS:
 5408 -5409  5410 -508 1162 0


c  2-1 --> 1
c    (-b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧ -p_508) -> (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0)
c  in CNF:
c     b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_2
c     b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_1
c     b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨  b^{2, 255}_0
c  in DIMACS:
 5408 -5409  5410  508 -5411 0
 5408 -5409  5410  508 -5412 0
 5408 -5409  5410  508  5413 0

c  1-1 --> 0
c    (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0 ∧ -p_508) -> (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧ -b^{2, 255}_0)
c  in CNF:
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_2
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_1
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_0
c  in DIMACS:
 5408  5409 -5410  508 -5411 0
 5408  5409 -5410  508 -5412 0
 5408  5409 -5410  508 -5413 0

c  0-1 --> -1
c    (-b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧ -p_508) -> ( b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0)
c  in CNF:
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨  b^{2, 255}_2
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_1
c     b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨  b^{2, 255}_0
c  in DIMACS:
 5408  5409  5410  508  5411 0
 5408  5409  5410  508 -5412 0
 5408  5409  5410  508  5413 0

c  -1-1 --> -2
c    ( b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧  b^{2, 254}_0 ∧ -p_508) -> ( b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0)
c  in CNF:
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨  b^{2, 255}_2
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨  b^{2, 255}_1
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨  p_508 ∨ -b^{2, 255}_0
c  in DIMACS:
-5408  5409 -5410  508  5411 0
-5408  5409 -5410  508  5412 0
-5408  5409 -5410  508 -5413 0

c  -2-1 --> break 
c    ( b^{2, 254}_2 ∧  b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧ -p_508) -> break
c  in CNF:
c    -b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨  b^{2, 254}_0 ∨  p_508 ∨ break
c  in DIMACS:
-5408 -5409  5410  508 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 254}_2 ∧ -b^{2, 254}_1 ∧ -b^{2, 254}_0 ∧ true) 
c  in CNF:
c    -b^{2, 254}_2 ∨  b^{2, 254}_1 ∨  b^{2, 254}_0 ∨ false 
c  in DIMACS:
-5408  5409  5410  0

c  3 does not represent an automaton state.
c    -(-b^{2, 254}_2 ∧  b^{2, 254}_1 ∧  b^{2, 254}_0 ∧ true) 
c  in CNF:
c     b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ false 
c  in DIMACS:
 5408 -5409 -5410  0
c  -3 does not represent an automaton state.
c    -( b^{2, 254}_2 ∧  b^{2, 254}_1 ∧  b^{2, 254}_0 ∧ true) 
c  in CNF:
c    -b^{2, 254}_2 ∨ -b^{2, 254}_1 ∨ -b^{2, 254}_0 ∨ false 
c  in DIMACS:
-5408 -5409 -5410  0

c i = 255
c  -2+1 --> -1
c    ( b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧  p_510) -> ( b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0)
c  in CNF:
c    -b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨  b^{2, 256}_2
c    -b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_1
c    -b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨  b^{2, 256}_0
c  in DIMACS:
-5411 -5412  5413 -510  5414 0
-5411 -5412  5413 -510 -5415 0
-5411 -5412  5413 -510  5416 0

c  -1+1 --> 0
c    ( b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0 ∧  p_510) -> (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧ -b^{2, 256}_0)
c  in CNF:
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_2
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_1
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_0
c  in DIMACS:
-5411  5412 -5413 -510 -5414 0
-5411  5412 -5413 -510 -5415 0
-5411  5412 -5413 -510 -5416 0

c  0+1 --> 1
c    (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧  p_510) -> (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0)
c  in CNF:
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_2
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_1
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨  b^{2, 256}_0
c  in DIMACS:
 5411  5412  5413 -510 -5414 0
 5411  5412  5413 -510 -5415 0
 5411  5412  5413 -510  5416 0

c  1+1 --> 2
c    (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0 ∧  p_510) -> (-b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0)
c  in CNF:
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_2
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨  b^{2, 256}_1
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ -p_510 ∨ -b^{2, 256}_0
c  in DIMACS:
 5411  5412 -5413 -510 -5414 0
 5411  5412 -5413 -510  5415 0
 5411  5412 -5413 -510 -5416 0

c  2+1 --> break 
c    (-b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧  p_510) -> break
c  in CNF:
c     b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 5411 -5412  5413 -510 1162 0


c  2-1 --> 1
c    (-b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧ -p_510) -> (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0)
c  in CNF:
c     b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_2
c     b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_1
c     b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨  b^{2, 256}_0
c  in DIMACS:
 5411 -5412  5413  510 -5414 0
 5411 -5412  5413  510 -5415 0
 5411 -5412  5413  510  5416 0

c  1-1 --> 0
c    (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0 ∧ -p_510) -> (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧ -b^{2, 256}_0)
c  in CNF:
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_2
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_1
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_0
c  in DIMACS:
 5411  5412 -5413  510 -5414 0
 5411  5412 -5413  510 -5415 0
 5411  5412 -5413  510 -5416 0

c  0-1 --> -1
c    (-b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧ -p_510) -> ( b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0)
c  in CNF:
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨  b^{2, 256}_2
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_1
c     b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨  b^{2, 256}_0
c  in DIMACS:
 5411  5412  5413  510  5414 0
 5411  5412  5413  510 -5415 0
 5411  5412  5413  510  5416 0

c  -1-1 --> -2
c    ( b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧  b^{2, 255}_0 ∧ -p_510) -> ( b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0)
c  in CNF:
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨  b^{2, 256}_2
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨  b^{2, 256}_1
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨  p_510 ∨ -b^{2, 256}_0
c  in DIMACS:
-5411  5412 -5413  510  5414 0
-5411  5412 -5413  510  5415 0
-5411  5412 -5413  510 -5416 0

c  -2-1 --> break 
c    ( b^{2, 255}_2 ∧  b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨  b^{2, 255}_0 ∨  p_510 ∨ break
c  in DIMACS:
-5411 -5412  5413  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 255}_2 ∧ -b^{2, 255}_1 ∧ -b^{2, 255}_0 ∧ true) 
c  in CNF:
c    -b^{2, 255}_2 ∨  b^{2, 255}_1 ∨  b^{2, 255}_0 ∨ false 
c  in DIMACS:
-5411  5412  5413  0

c  3 does not represent an automaton state.
c    -(-b^{2, 255}_2 ∧  b^{2, 255}_1 ∧  b^{2, 255}_0 ∧ true) 
c  in CNF:
c     b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ false 
c  in DIMACS:
 5411 -5412 -5413  0
c  -3 does not represent an automaton state.
c    -( b^{2, 255}_2 ∧  b^{2, 255}_1 ∧  b^{2, 255}_0 ∧ true) 
c  in CNF:
c    -b^{2, 255}_2 ∨ -b^{2, 255}_1 ∨ -b^{2, 255}_0 ∨ false 
c  in DIMACS:
-5411 -5412 -5413  0

c i = 256
c  -2+1 --> -1
c    ( b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧  p_512) -> ( b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0)
c  in CNF:
c    -b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨  b^{2, 257}_2
c    -b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_1
c    -b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨  b^{2, 257}_0
c  in DIMACS:
-5414 -5415  5416 -512  5417 0
-5414 -5415  5416 -512 -5418 0
-5414 -5415  5416 -512  5419 0

c  -1+1 --> 0
c    ( b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0 ∧  p_512) -> (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧ -b^{2, 257}_0)
c  in CNF:
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_2
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_1
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_0
c  in DIMACS:
-5414  5415 -5416 -512 -5417 0
-5414  5415 -5416 -512 -5418 0
-5414  5415 -5416 -512 -5419 0

c  0+1 --> 1
c    (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧  p_512) -> (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0)
c  in CNF:
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_2
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_1
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨  b^{2, 257}_0
c  in DIMACS:
 5414  5415  5416 -512 -5417 0
 5414  5415  5416 -512 -5418 0
 5414  5415  5416 -512  5419 0

c  1+1 --> 2
c    (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0 ∧  p_512) -> (-b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0)
c  in CNF:
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_2
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨  b^{2, 257}_1
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ -p_512 ∨ -b^{2, 257}_0
c  in DIMACS:
 5414  5415 -5416 -512 -5417 0
 5414  5415 -5416 -512  5418 0
 5414  5415 -5416 -512 -5419 0

c  2+1 --> break 
c    (-b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧  p_512) -> break
c  in CNF:
c     b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 5414 -5415  5416 -512 1162 0


c  2-1 --> 1
c    (-b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧ -p_512) -> (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0)
c  in CNF:
c     b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_2
c     b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_1
c     b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨  b^{2, 257}_0
c  in DIMACS:
 5414 -5415  5416  512 -5417 0
 5414 -5415  5416  512 -5418 0
 5414 -5415  5416  512  5419 0

c  1-1 --> 0
c    (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0 ∧ -p_512) -> (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧ -b^{2, 257}_0)
c  in CNF:
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_2
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_1
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_0
c  in DIMACS:
 5414  5415 -5416  512 -5417 0
 5414  5415 -5416  512 -5418 0
 5414  5415 -5416  512 -5419 0

c  0-1 --> -1
c    (-b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧ -p_512) -> ( b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0)
c  in CNF:
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨  b^{2, 257}_2
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_1
c     b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨  b^{2, 257}_0
c  in DIMACS:
 5414  5415  5416  512  5417 0
 5414  5415  5416  512 -5418 0
 5414  5415  5416  512  5419 0

c  -1-1 --> -2
c    ( b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧  b^{2, 256}_0 ∧ -p_512) -> ( b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0)
c  in CNF:
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨  b^{2, 257}_2
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨  b^{2, 257}_1
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨  p_512 ∨ -b^{2, 257}_0
c  in DIMACS:
-5414  5415 -5416  512  5417 0
-5414  5415 -5416  512  5418 0
-5414  5415 -5416  512 -5419 0

c  -2-1 --> break 
c    ( b^{2, 256}_2 ∧  b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨  b^{2, 256}_0 ∨  p_512 ∨ break
c  in DIMACS:
-5414 -5415  5416  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 256}_2 ∧ -b^{2, 256}_1 ∧ -b^{2, 256}_0 ∧ true) 
c  in CNF:
c    -b^{2, 256}_2 ∨  b^{2, 256}_1 ∨  b^{2, 256}_0 ∨ false 
c  in DIMACS:
-5414  5415  5416  0

c  3 does not represent an automaton state.
c    -(-b^{2, 256}_2 ∧  b^{2, 256}_1 ∧  b^{2, 256}_0 ∧ true) 
c  in CNF:
c     b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ false 
c  in DIMACS:
 5414 -5415 -5416  0
c  -3 does not represent an automaton state.
c    -( b^{2, 256}_2 ∧  b^{2, 256}_1 ∧  b^{2, 256}_0 ∧ true) 
c  in CNF:
c    -b^{2, 256}_2 ∨ -b^{2, 256}_1 ∨ -b^{2, 256}_0 ∨ false 
c  in DIMACS:
-5414 -5415 -5416  0

c i = 257
c  -2+1 --> -1
c    ( b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧  p_514) -> ( b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0)
c  in CNF:
c    -b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨  b^{2, 258}_2
c    -b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_1
c    -b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨  b^{2, 258}_0
c  in DIMACS:
-5417 -5418  5419 -514  5420 0
-5417 -5418  5419 -514 -5421 0
-5417 -5418  5419 -514  5422 0

c  -1+1 --> 0
c    ( b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0 ∧  p_514) -> (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧ -b^{2, 258}_0)
c  in CNF:
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_2
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_1
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_0
c  in DIMACS:
-5417  5418 -5419 -514 -5420 0
-5417  5418 -5419 -514 -5421 0
-5417  5418 -5419 -514 -5422 0

c  0+1 --> 1
c    (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧  p_514) -> (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0)
c  in CNF:
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_2
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_1
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨  b^{2, 258}_0
c  in DIMACS:
 5417  5418  5419 -514 -5420 0
 5417  5418  5419 -514 -5421 0
 5417  5418  5419 -514  5422 0

c  1+1 --> 2
c    (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0 ∧  p_514) -> (-b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0)
c  in CNF:
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_2
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨  b^{2, 258}_1
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ -p_514 ∨ -b^{2, 258}_0
c  in DIMACS:
 5417  5418 -5419 -514 -5420 0
 5417  5418 -5419 -514  5421 0
 5417  5418 -5419 -514 -5422 0

c  2+1 --> break 
c    (-b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧  p_514) -> break
c  in CNF:
c     b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ -p_514 ∨ break
c  in DIMACS:
 5417 -5418  5419 -514 1162 0


c  2-1 --> 1
c    (-b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧ -p_514) -> (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0)
c  in CNF:
c     b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_2
c     b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_1
c     b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨  b^{2, 258}_0
c  in DIMACS:
 5417 -5418  5419  514 -5420 0
 5417 -5418  5419  514 -5421 0
 5417 -5418  5419  514  5422 0

c  1-1 --> 0
c    (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0 ∧ -p_514) -> (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧ -b^{2, 258}_0)
c  in CNF:
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_2
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_1
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_0
c  in DIMACS:
 5417  5418 -5419  514 -5420 0
 5417  5418 -5419  514 -5421 0
 5417  5418 -5419  514 -5422 0

c  0-1 --> -1
c    (-b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧ -p_514) -> ( b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0)
c  in CNF:
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨  b^{2, 258}_2
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_1
c     b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨  b^{2, 258}_0
c  in DIMACS:
 5417  5418  5419  514  5420 0
 5417  5418  5419  514 -5421 0
 5417  5418  5419  514  5422 0

c  -1-1 --> -2
c    ( b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧  b^{2, 257}_0 ∧ -p_514) -> ( b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0)
c  in CNF:
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨  b^{2, 258}_2
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨  b^{2, 258}_1
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨  p_514 ∨ -b^{2, 258}_0
c  in DIMACS:
-5417  5418 -5419  514  5420 0
-5417  5418 -5419  514  5421 0
-5417  5418 -5419  514 -5422 0

c  -2-1 --> break 
c    ( b^{2, 257}_2 ∧  b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧ -p_514) -> break
c  in CNF:
c    -b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨  b^{2, 257}_0 ∨  p_514 ∨ break
c  in DIMACS:
-5417 -5418  5419  514 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 257}_2 ∧ -b^{2, 257}_1 ∧ -b^{2, 257}_0 ∧ true) 
c  in CNF:
c    -b^{2, 257}_2 ∨  b^{2, 257}_1 ∨  b^{2, 257}_0 ∨ false 
c  in DIMACS:
-5417  5418  5419  0

c  3 does not represent an automaton state.
c    -(-b^{2, 257}_2 ∧  b^{2, 257}_1 ∧  b^{2, 257}_0 ∧ true) 
c  in CNF:
c     b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ false 
c  in DIMACS:
 5417 -5418 -5419  0
c  -3 does not represent an automaton state.
c    -( b^{2, 257}_2 ∧  b^{2, 257}_1 ∧  b^{2, 257}_0 ∧ true) 
c  in CNF:
c    -b^{2, 257}_2 ∨ -b^{2, 257}_1 ∨ -b^{2, 257}_0 ∨ false 
c  in DIMACS:
-5417 -5418 -5419  0

c i = 258
c  -2+1 --> -1
c    ( b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧  p_516) -> ( b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0)
c  in CNF:
c    -b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨  b^{2, 259}_2
c    -b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_1
c    -b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨  b^{2, 259}_0
c  in DIMACS:
-5420 -5421  5422 -516  5423 0
-5420 -5421  5422 -516 -5424 0
-5420 -5421  5422 -516  5425 0

c  -1+1 --> 0
c    ( b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0 ∧  p_516) -> (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧ -b^{2, 259}_0)
c  in CNF:
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_2
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_1
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_0
c  in DIMACS:
-5420  5421 -5422 -516 -5423 0
-5420  5421 -5422 -516 -5424 0
-5420  5421 -5422 -516 -5425 0

c  0+1 --> 1
c    (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧  p_516) -> (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0)
c  in CNF:
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_2
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_1
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨  b^{2, 259}_0
c  in DIMACS:
 5420  5421  5422 -516 -5423 0
 5420  5421  5422 -516 -5424 0
 5420  5421  5422 -516  5425 0

c  1+1 --> 2
c    (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0 ∧  p_516) -> (-b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0)
c  in CNF:
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_2
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨  b^{2, 259}_1
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ -p_516 ∨ -b^{2, 259}_0
c  in DIMACS:
 5420  5421 -5422 -516 -5423 0
 5420  5421 -5422 -516  5424 0
 5420  5421 -5422 -516 -5425 0

c  2+1 --> break 
c    (-b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧  p_516) -> break
c  in CNF:
c     b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 5420 -5421  5422 -516 1162 0


c  2-1 --> 1
c    (-b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧ -p_516) -> (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0)
c  in CNF:
c     b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_2
c     b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_1
c     b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨  b^{2, 259}_0
c  in DIMACS:
 5420 -5421  5422  516 -5423 0
 5420 -5421  5422  516 -5424 0
 5420 -5421  5422  516  5425 0

c  1-1 --> 0
c    (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0 ∧ -p_516) -> (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧ -b^{2, 259}_0)
c  in CNF:
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_2
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_1
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_0
c  in DIMACS:
 5420  5421 -5422  516 -5423 0
 5420  5421 -5422  516 -5424 0
 5420  5421 -5422  516 -5425 0

c  0-1 --> -1
c    (-b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧ -p_516) -> ( b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0)
c  in CNF:
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨  b^{2, 259}_2
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_1
c     b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨  b^{2, 259}_0
c  in DIMACS:
 5420  5421  5422  516  5423 0
 5420  5421  5422  516 -5424 0
 5420  5421  5422  516  5425 0

c  -1-1 --> -2
c    ( b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧  b^{2, 258}_0 ∧ -p_516) -> ( b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0)
c  in CNF:
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨  b^{2, 259}_2
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨  b^{2, 259}_1
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨  p_516 ∨ -b^{2, 259}_0
c  in DIMACS:
-5420  5421 -5422  516  5423 0
-5420  5421 -5422  516  5424 0
-5420  5421 -5422  516 -5425 0

c  -2-1 --> break 
c    ( b^{2, 258}_2 ∧  b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨  b^{2, 258}_0 ∨  p_516 ∨ break
c  in DIMACS:
-5420 -5421  5422  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 258}_2 ∧ -b^{2, 258}_1 ∧ -b^{2, 258}_0 ∧ true) 
c  in CNF:
c    -b^{2, 258}_2 ∨  b^{2, 258}_1 ∨  b^{2, 258}_0 ∨ false 
c  in DIMACS:
-5420  5421  5422  0

c  3 does not represent an automaton state.
c    -(-b^{2, 258}_2 ∧  b^{2, 258}_1 ∧  b^{2, 258}_0 ∧ true) 
c  in CNF:
c     b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ false 
c  in DIMACS:
 5420 -5421 -5422  0
c  -3 does not represent an automaton state.
c    -( b^{2, 258}_2 ∧  b^{2, 258}_1 ∧  b^{2, 258}_0 ∧ true) 
c  in CNF:
c    -b^{2, 258}_2 ∨ -b^{2, 258}_1 ∨ -b^{2, 258}_0 ∨ false 
c  in DIMACS:
-5420 -5421 -5422  0

c i = 259
c  -2+1 --> -1
c    ( b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧  p_518) -> ( b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0)
c  in CNF:
c    -b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨  b^{2, 260}_2
c    -b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_1
c    -b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨  b^{2, 260}_0
c  in DIMACS:
-5423 -5424  5425 -518  5426 0
-5423 -5424  5425 -518 -5427 0
-5423 -5424  5425 -518  5428 0

c  -1+1 --> 0
c    ( b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0 ∧  p_518) -> (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧ -b^{2, 260}_0)
c  in CNF:
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_2
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_1
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_0
c  in DIMACS:
-5423  5424 -5425 -518 -5426 0
-5423  5424 -5425 -518 -5427 0
-5423  5424 -5425 -518 -5428 0

c  0+1 --> 1
c    (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧  p_518) -> (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0)
c  in CNF:
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_2
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_1
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨  b^{2, 260}_0
c  in DIMACS:
 5423  5424  5425 -518 -5426 0
 5423  5424  5425 -518 -5427 0
 5423  5424  5425 -518  5428 0

c  1+1 --> 2
c    (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0 ∧  p_518) -> (-b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0)
c  in CNF:
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_2
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨  b^{2, 260}_1
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ -p_518 ∨ -b^{2, 260}_0
c  in DIMACS:
 5423  5424 -5425 -518 -5426 0
 5423  5424 -5425 -518  5427 0
 5423  5424 -5425 -518 -5428 0

c  2+1 --> break 
c    (-b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧  p_518) -> break
c  in CNF:
c     b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 5423 -5424  5425 -518 1162 0


c  2-1 --> 1
c    (-b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧ -p_518) -> (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0)
c  in CNF:
c     b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_2
c     b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_1
c     b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨  b^{2, 260}_0
c  in DIMACS:
 5423 -5424  5425  518 -5426 0
 5423 -5424  5425  518 -5427 0
 5423 -5424  5425  518  5428 0

c  1-1 --> 0
c    (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0 ∧ -p_518) -> (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧ -b^{2, 260}_0)
c  in CNF:
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_2
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_1
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_0
c  in DIMACS:
 5423  5424 -5425  518 -5426 0
 5423  5424 -5425  518 -5427 0
 5423  5424 -5425  518 -5428 0

c  0-1 --> -1
c    (-b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧ -p_518) -> ( b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0)
c  in CNF:
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨  b^{2, 260}_2
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_1
c     b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨  b^{2, 260}_0
c  in DIMACS:
 5423  5424  5425  518  5426 0
 5423  5424  5425  518 -5427 0
 5423  5424  5425  518  5428 0

c  -1-1 --> -2
c    ( b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧  b^{2, 259}_0 ∧ -p_518) -> ( b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0)
c  in CNF:
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨  b^{2, 260}_2
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨  b^{2, 260}_1
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨  p_518 ∨ -b^{2, 260}_0
c  in DIMACS:
-5423  5424 -5425  518  5426 0
-5423  5424 -5425  518  5427 0
-5423  5424 -5425  518 -5428 0

c  -2-1 --> break 
c    ( b^{2, 259}_2 ∧  b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨  b^{2, 259}_0 ∨  p_518 ∨ break
c  in DIMACS:
-5423 -5424  5425  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 259}_2 ∧ -b^{2, 259}_1 ∧ -b^{2, 259}_0 ∧ true) 
c  in CNF:
c    -b^{2, 259}_2 ∨  b^{2, 259}_1 ∨  b^{2, 259}_0 ∨ false 
c  in DIMACS:
-5423  5424  5425  0

c  3 does not represent an automaton state.
c    -(-b^{2, 259}_2 ∧  b^{2, 259}_1 ∧  b^{2, 259}_0 ∧ true) 
c  in CNF:
c     b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ false 
c  in DIMACS:
 5423 -5424 -5425  0
c  -3 does not represent an automaton state.
c    -( b^{2, 259}_2 ∧  b^{2, 259}_1 ∧  b^{2, 259}_0 ∧ true) 
c  in CNF:
c    -b^{2, 259}_2 ∨ -b^{2, 259}_1 ∨ -b^{2, 259}_0 ∨ false 
c  in DIMACS:
-5423 -5424 -5425  0

c i = 260
c  -2+1 --> -1
c    ( b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧  p_520) -> ( b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0)
c  in CNF:
c    -b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨  b^{2, 261}_2
c    -b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_1
c    -b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨  b^{2, 261}_0
c  in DIMACS:
-5426 -5427  5428 -520  5429 0
-5426 -5427  5428 -520 -5430 0
-5426 -5427  5428 -520  5431 0

c  -1+1 --> 0
c    ( b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0 ∧  p_520) -> (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧ -b^{2, 261}_0)
c  in CNF:
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_2
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_1
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_0
c  in DIMACS:
-5426  5427 -5428 -520 -5429 0
-5426  5427 -5428 -520 -5430 0
-5426  5427 -5428 -520 -5431 0

c  0+1 --> 1
c    (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧  p_520) -> (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0)
c  in CNF:
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_2
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_1
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨  b^{2, 261}_0
c  in DIMACS:
 5426  5427  5428 -520 -5429 0
 5426  5427  5428 -520 -5430 0
 5426  5427  5428 -520  5431 0

c  1+1 --> 2
c    (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0 ∧  p_520) -> (-b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0)
c  in CNF:
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_2
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨  b^{2, 261}_1
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ -p_520 ∨ -b^{2, 261}_0
c  in DIMACS:
 5426  5427 -5428 -520 -5429 0
 5426  5427 -5428 -520  5430 0
 5426  5427 -5428 -520 -5431 0

c  2+1 --> break 
c    (-b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧  p_520) -> break
c  in CNF:
c     b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 5426 -5427  5428 -520 1162 0


c  2-1 --> 1
c    (-b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧ -p_520) -> (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0)
c  in CNF:
c     b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_2
c     b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_1
c     b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨  b^{2, 261}_0
c  in DIMACS:
 5426 -5427  5428  520 -5429 0
 5426 -5427  5428  520 -5430 0
 5426 -5427  5428  520  5431 0

c  1-1 --> 0
c    (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0 ∧ -p_520) -> (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧ -b^{2, 261}_0)
c  in CNF:
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_2
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_1
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_0
c  in DIMACS:
 5426  5427 -5428  520 -5429 0
 5426  5427 -5428  520 -5430 0
 5426  5427 -5428  520 -5431 0

c  0-1 --> -1
c    (-b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧ -p_520) -> ( b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0)
c  in CNF:
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨  b^{2, 261}_2
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_1
c     b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨  b^{2, 261}_0
c  in DIMACS:
 5426  5427  5428  520  5429 0
 5426  5427  5428  520 -5430 0
 5426  5427  5428  520  5431 0

c  -1-1 --> -2
c    ( b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧  b^{2, 260}_0 ∧ -p_520) -> ( b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0)
c  in CNF:
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨  b^{2, 261}_2
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨  b^{2, 261}_1
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨  p_520 ∨ -b^{2, 261}_0
c  in DIMACS:
-5426  5427 -5428  520  5429 0
-5426  5427 -5428  520  5430 0
-5426  5427 -5428  520 -5431 0

c  -2-1 --> break 
c    ( b^{2, 260}_2 ∧  b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨  b^{2, 260}_0 ∨  p_520 ∨ break
c  in DIMACS:
-5426 -5427  5428  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 260}_2 ∧ -b^{2, 260}_1 ∧ -b^{2, 260}_0 ∧ true) 
c  in CNF:
c    -b^{2, 260}_2 ∨  b^{2, 260}_1 ∨  b^{2, 260}_0 ∨ false 
c  in DIMACS:
-5426  5427  5428  0

c  3 does not represent an automaton state.
c    -(-b^{2, 260}_2 ∧  b^{2, 260}_1 ∧  b^{2, 260}_0 ∧ true) 
c  in CNF:
c     b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ false 
c  in DIMACS:
 5426 -5427 -5428  0
c  -3 does not represent an automaton state.
c    -( b^{2, 260}_2 ∧  b^{2, 260}_1 ∧  b^{2, 260}_0 ∧ true) 
c  in CNF:
c    -b^{2, 260}_2 ∨ -b^{2, 260}_1 ∨ -b^{2, 260}_0 ∨ false 
c  in DIMACS:
-5426 -5427 -5428  0

c i = 261
c  -2+1 --> -1
c    ( b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧  p_522) -> ( b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0)
c  in CNF:
c    -b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨  b^{2, 262}_2
c    -b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_1
c    -b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨  b^{2, 262}_0
c  in DIMACS:
-5429 -5430  5431 -522  5432 0
-5429 -5430  5431 -522 -5433 0
-5429 -5430  5431 -522  5434 0

c  -1+1 --> 0
c    ( b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0 ∧  p_522) -> (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧ -b^{2, 262}_0)
c  in CNF:
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_2
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_1
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_0
c  in DIMACS:
-5429  5430 -5431 -522 -5432 0
-5429  5430 -5431 -522 -5433 0
-5429  5430 -5431 -522 -5434 0

c  0+1 --> 1
c    (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧  p_522) -> (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0)
c  in CNF:
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_2
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_1
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨  b^{2, 262}_0
c  in DIMACS:
 5429  5430  5431 -522 -5432 0
 5429  5430  5431 -522 -5433 0
 5429  5430  5431 -522  5434 0

c  1+1 --> 2
c    (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0 ∧  p_522) -> (-b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0)
c  in CNF:
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_2
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨  b^{2, 262}_1
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ -p_522 ∨ -b^{2, 262}_0
c  in DIMACS:
 5429  5430 -5431 -522 -5432 0
 5429  5430 -5431 -522  5433 0
 5429  5430 -5431 -522 -5434 0

c  2+1 --> break 
c    (-b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧  p_522) -> break
c  in CNF:
c     b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 5429 -5430  5431 -522 1162 0


c  2-1 --> 1
c    (-b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧ -p_522) -> (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0)
c  in CNF:
c     b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_2
c     b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_1
c     b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨  b^{2, 262}_0
c  in DIMACS:
 5429 -5430  5431  522 -5432 0
 5429 -5430  5431  522 -5433 0
 5429 -5430  5431  522  5434 0

c  1-1 --> 0
c    (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0 ∧ -p_522) -> (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧ -b^{2, 262}_0)
c  in CNF:
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_2
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_1
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_0
c  in DIMACS:
 5429  5430 -5431  522 -5432 0
 5429  5430 -5431  522 -5433 0
 5429  5430 -5431  522 -5434 0

c  0-1 --> -1
c    (-b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧ -p_522) -> ( b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0)
c  in CNF:
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨  b^{2, 262}_2
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_1
c     b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨  b^{2, 262}_0
c  in DIMACS:
 5429  5430  5431  522  5432 0
 5429  5430  5431  522 -5433 0
 5429  5430  5431  522  5434 0

c  -1-1 --> -2
c    ( b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧  b^{2, 261}_0 ∧ -p_522) -> ( b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0)
c  in CNF:
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨  b^{2, 262}_2
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨  b^{2, 262}_1
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨  p_522 ∨ -b^{2, 262}_0
c  in DIMACS:
-5429  5430 -5431  522  5432 0
-5429  5430 -5431  522  5433 0
-5429  5430 -5431  522 -5434 0

c  -2-1 --> break 
c    ( b^{2, 261}_2 ∧  b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨  b^{2, 261}_0 ∨  p_522 ∨ break
c  in DIMACS:
-5429 -5430  5431  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 261}_2 ∧ -b^{2, 261}_1 ∧ -b^{2, 261}_0 ∧ true) 
c  in CNF:
c    -b^{2, 261}_2 ∨  b^{2, 261}_1 ∨  b^{2, 261}_0 ∨ false 
c  in DIMACS:
-5429  5430  5431  0

c  3 does not represent an automaton state.
c    -(-b^{2, 261}_2 ∧  b^{2, 261}_1 ∧  b^{2, 261}_0 ∧ true) 
c  in CNF:
c     b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ false 
c  in DIMACS:
 5429 -5430 -5431  0
c  -3 does not represent an automaton state.
c    -( b^{2, 261}_2 ∧  b^{2, 261}_1 ∧  b^{2, 261}_0 ∧ true) 
c  in CNF:
c    -b^{2, 261}_2 ∨ -b^{2, 261}_1 ∨ -b^{2, 261}_0 ∨ false 
c  in DIMACS:
-5429 -5430 -5431  0

c i = 262
c  -2+1 --> -1
c    ( b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧  p_524) -> ( b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0)
c  in CNF:
c    -b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨  b^{2, 263}_2
c    -b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_1
c    -b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨  b^{2, 263}_0
c  in DIMACS:
-5432 -5433  5434 -524  5435 0
-5432 -5433  5434 -524 -5436 0
-5432 -5433  5434 -524  5437 0

c  -1+1 --> 0
c    ( b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0 ∧  p_524) -> (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧ -b^{2, 263}_0)
c  in CNF:
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_2
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_1
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_0
c  in DIMACS:
-5432  5433 -5434 -524 -5435 0
-5432  5433 -5434 -524 -5436 0
-5432  5433 -5434 -524 -5437 0

c  0+1 --> 1
c    (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧  p_524) -> (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0)
c  in CNF:
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_2
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_1
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨  b^{2, 263}_0
c  in DIMACS:
 5432  5433  5434 -524 -5435 0
 5432  5433  5434 -524 -5436 0
 5432  5433  5434 -524  5437 0

c  1+1 --> 2
c    (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0 ∧  p_524) -> (-b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0)
c  in CNF:
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_2
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨  b^{2, 263}_1
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ -p_524 ∨ -b^{2, 263}_0
c  in DIMACS:
 5432  5433 -5434 -524 -5435 0
 5432  5433 -5434 -524  5436 0
 5432  5433 -5434 -524 -5437 0

c  2+1 --> break 
c    (-b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧  p_524) -> break
c  in CNF:
c     b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ -p_524 ∨ break
c  in DIMACS:
 5432 -5433  5434 -524 1162 0


c  2-1 --> 1
c    (-b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧ -p_524) -> (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0)
c  in CNF:
c     b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_2
c     b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_1
c     b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨  b^{2, 263}_0
c  in DIMACS:
 5432 -5433  5434  524 -5435 0
 5432 -5433  5434  524 -5436 0
 5432 -5433  5434  524  5437 0

c  1-1 --> 0
c    (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0 ∧ -p_524) -> (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧ -b^{2, 263}_0)
c  in CNF:
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_2
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_1
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_0
c  in DIMACS:
 5432  5433 -5434  524 -5435 0
 5432  5433 -5434  524 -5436 0
 5432  5433 -5434  524 -5437 0

c  0-1 --> -1
c    (-b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧ -p_524) -> ( b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0)
c  in CNF:
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨  b^{2, 263}_2
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_1
c     b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨  b^{2, 263}_0
c  in DIMACS:
 5432  5433  5434  524  5435 0
 5432  5433  5434  524 -5436 0
 5432  5433  5434  524  5437 0

c  -1-1 --> -2
c    ( b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧  b^{2, 262}_0 ∧ -p_524) -> ( b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0)
c  in CNF:
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨  b^{2, 263}_2
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨  b^{2, 263}_1
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨  p_524 ∨ -b^{2, 263}_0
c  in DIMACS:
-5432  5433 -5434  524  5435 0
-5432  5433 -5434  524  5436 0
-5432  5433 -5434  524 -5437 0

c  -2-1 --> break 
c    ( b^{2, 262}_2 ∧  b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧ -p_524) -> break
c  in CNF:
c    -b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨  b^{2, 262}_0 ∨  p_524 ∨ break
c  in DIMACS:
-5432 -5433  5434  524 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 262}_2 ∧ -b^{2, 262}_1 ∧ -b^{2, 262}_0 ∧ true) 
c  in CNF:
c    -b^{2, 262}_2 ∨  b^{2, 262}_1 ∨  b^{2, 262}_0 ∨ false 
c  in DIMACS:
-5432  5433  5434  0

c  3 does not represent an automaton state.
c    -(-b^{2, 262}_2 ∧  b^{2, 262}_1 ∧  b^{2, 262}_0 ∧ true) 
c  in CNF:
c     b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ false 
c  in DIMACS:
 5432 -5433 -5434  0
c  -3 does not represent an automaton state.
c    -( b^{2, 262}_2 ∧  b^{2, 262}_1 ∧  b^{2, 262}_0 ∧ true) 
c  in CNF:
c    -b^{2, 262}_2 ∨ -b^{2, 262}_1 ∨ -b^{2, 262}_0 ∨ false 
c  in DIMACS:
-5432 -5433 -5434  0

c i = 263
c  -2+1 --> -1
c    ( b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧  p_526) -> ( b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0)
c  in CNF:
c    -b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨  b^{2, 264}_2
c    -b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_1
c    -b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨  b^{2, 264}_0
c  in DIMACS:
-5435 -5436  5437 -526  5438 0
-5435 -5436  5437 -526 -5439 0
-5435 -5436  5437 -526  5440 0

c  -1+1 --> 0
c    ( b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0 ∧  p_526) -> (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧ -b^{2, 264}_0)
c  in CNF:
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_2
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_1
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_0
c  in DIMACS:
-5435  5436 -5437 -526 -5438 0
-5435  5436 -5437 -526 -5439 0
-5435  5436 -5437 -526 -5440 0

c  0+1 --> 1
c    (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧  p_526) -> (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0)
c  in CNF:
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_2
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_1
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨  b^{2, 264}_0
c  in DIMACS:
 5435  5436  5437 -526 -5438 0
 5435  5436  5437 -526 -5439 0
 5435  5436  5437 -526  5440 0

c  1+1 --> 2
c    (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0 ∧  p_526) -> (-b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0)
c  in CNF:
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_2
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨  b^{2, 264}_1
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ -p_526 ∨ -b^{2, 264}_0
c  in DIMACS:
 5435  5436 -5437 -526 -5438 0
 5435  5436 -5437 -526  5439 0
 5435  5436 -5437 -526 -5440 0

c  2+1 --> break 
c    (-b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧  p_526) -> break
c  in CNF:
c     b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ -p_526 ∨ break
c  in DIMACS:
 5435 -5436  5437 -526 1162 0


c  2-1 --> 1
c    (-b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧ -p_526) -> (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0)
c  in CNF:
c     b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_2
c     b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_1
c     b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨  b^{2, 264}_0
c  in DIMACS:
 5435 -5436  5437  526 -5438 0
 5435 -5436  5437  526 -5439 0
 5435 -5436  5437  526  5440 0

c  1-1 --> 0
c    (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0 ∧ -p_526) -> (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧ -b^{2, 264}_0)
c  in CNF:
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_2
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_1
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_0
c  in DIMACS:
 5435  5436 -5437  526 -5438 0
 5435  5436 -5437  526 -5439 0
 5435  5436 -5437  526 -5440 0

c  0-1 --> -1
c    (-b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧ -p_526) -> ( b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0)
c  in CNF:
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨  b^{2, 264}_2
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_1
c     b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨  b^{2, 264}_0
c  in DIMACS:
 5435  5436  5437  526  5438 0
 5435  5436  5437  526 -5439 0
 5435  5436  5437  526  5440 0

c  -1-1 --> -2
c    ( b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧  b^{2, 263}_0 ∧ -p_526) -> ( b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0)
c  in CNF:
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨  b^{2, 264}_2
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨  b^{2, 264}_1
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨  p_526 ∨ -b^{2, 264}_0
c  in DIMACS:
-5435  5436 -5437  526  5438 0
-5435  5436 -5437  526  5439 0
-5435  5436 -5437  526 -5440 0

c  -2-1 --> break 
c    ( b^{2, 263}_2 ∧  b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧ -p_526) -> break
c  in CNF:
c    -b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨  b^{2, 263}_0 ∨  p_526 ∨ break
c  in DIMACS:
-5435 -5436  5437  526 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 263}_2 ∧ -b^{2, 263}_1 ∧ -b^{2, 263}_0 ∧ true) 
c  in CNF:
c    -b^{2, 263}_2 ∨  b^{2, 263}_1 ∨  b^{2, 263}_0 ∨ false 
c  in DIMACS:
-5435  5436  5437  0

c  3 does not represent an automaton state.
c    -(-b^{2, 263}_2 ∧  b^{2, 263}_1 ∧  b^{2, 263}_0 ∧ true) 
c  in CNF:
c     b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ false 
c  in DIMACS:
 5435 -5436 -5437  0
c  -3 does not represent an automaton state.
c    -( b^{2, 263}_2 ∧  b^{2, 263}_1 ∧  b^{2, 263}_0 ∧ true) 
c  in CNF:
c    -b^{2, 263}_2 ∨ -b^{2, 263}_1 ∨ -b^{2, 263}_0 ∨ false 
c  in DIMACS:
-5435 -5436 -5437  0

c i = 264
c  -2+1 --> -1
c    ( b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧  p_528) -> ( b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0)
c  in CNF:
c    -b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨  b^{2, 265}_2
c    -b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_1
c    -b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨  b^{2, 265}_0
c  in DIMACS:
-5438 -5439  5440 -528  5441 0
-5438 -5439  5440 -528 -5442 0
-5438 -5439  5440 -528  5443 0

c  -1+1 --> 0
c    ( b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0 ∧  p_528) -> (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧ -b^{2, 265}_0)
c  in CNF:
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_2
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_1
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_0
c  in DIMACS:
-5438  5439 -5440 -528 -5441 0
-5438  5439 -5440 -528 -5442 0
-5438  5439 -5440 -528 -5443 0

c  0+1 --> 1
c    (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧  p_528) -> (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0)
c  in CNF:
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_2
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_1
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨  b^{2, 265}_0
c  in DIMACS:
 5438  5439  5440 -528 -5441 0
 5438  5439  5440 -528 -5442 0
 5438  5439  5440 -528  5443 0

c  1+1 --> 2
c    (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0 ∧  p_528) -> (-b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0)
c  in CNF:
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_2
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨  b^{2, 265}_1
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ -p_528 ∨ -b^{2, 265}_0
c  in DIMACS:
 5438  5439 -5440 -528 -5441 0
 5438  5439 -5440 -528  5442 0
 5438  5439 -5440 -528 -5443 0

c  2+1 --> break 
c    (-b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧  p_528) -> break
c  in CNF:
c     b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 5438 -5439  5440 -528 1162 0


c  2-1 --> 1
c    (-b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧ -p_528) -> (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0)
c  in CNF:
c     b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_2
c     b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_1
c     b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨  b^{2, 265}_0
c  in DIMACS:
 5438 -5439  5440  528 -5441 0
 5438 -5439  5440  528 -5442 0
 5438 -5439  5440  528  5443 0

c  1-1 --> 0
c    (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0 ∧ -p_528) -> (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧ -b^{2, 265}_0)
c  in CNF:
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_2
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_1
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_0
c  in DIMACS:
 5438  5439 -5440  528 -5441 0
 5438  5439 -5440  528 -5442 0
 5438  5439 -5440  528 -5443 0

c  0-1 --> -1
c    (-b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧ -p_528) -> ( b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0)
c  in CNF:
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨  b^{2, 265}_2
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_1
c     b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨  b^{2, 265}_0
c  in DIMACS:
 5438  5439  5440  528  5441 0
 5438  5439  5440  528 -5442 0
 5438  5439  5440  528  5443 0

c  -1-1 --> -2
c    ( b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧  b^{2, 264}_0 ∧ -p_528) -> ( b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0)
c  in CNF:
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨  b^{2, 265}_2
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨  b^{2, 265}_1
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨  p_528 ∨ -b^{2, 265}_0
c  in DIMACS:
-5438  5439 -5440  528  5441 0
-5438  5439 -5440  528  5442 0
-5438  5439 -5440  528 -5443 0

c  -2-1 --> break 
c    ( b^{2, 264}_2 ∧  b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨  b^{2, 264}_0 ∨  p_528 ∨ break
c  in DIMACS:
-5438 -5439  5440  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 264}_2 ∧ -b^{2, 264}_1 ∧ -b^{2, 264}_0 ∧ true) 
c  in CNF:
c    -b^{2, 264}_2 ∨  b^{2, 264}_1 ∨  b^{2, 264}_0 ∨ false 
c  in DIMACS:
-5438  5439  5440  0

c  3 does not represent an automaton state.
c    -(-b^{2, 264}_2 ∧  b^{2, 264}_1 ∧  b^{2, 264}_0 ∧ true) 
c  in CNF:
c     b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ false 
c  in DIMACS:
 5438 -5439 -5440  0
c  -3 does not represent an automaton state.
c    -( b^{2, 264}_2 ∧  b^{2, 264}_1 ∧  b^{2, 264}_0 ∧ true) 
c  in CNF:
c    -b^{2, 264}_2 ∨ -b^{2, 264}_1 ∨ -b^{2, 264}_0 ∨ false 
c  in DIMACS:
-5438 -5439 -5440  0

c i = 265
c  -2+1 --> -1
c    ( b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧  p_530) -> ( b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0)
c  in CNF:
c    -b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨  b^{2, 266}_2
c    -b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_1
c    -b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨  b^{2, 266}_0
c  in DIMACS:
-5441 -5442  5443 -530  5444 0
-5441 -5442  5443 -530 -5445 0
-5441 -5442  5443 -530  5446 0

c  -1+1 --> 0
c    ( b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0 ∧  p_530) -> (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧ -b^{2, 266}_0)
c  in CNF:
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_2
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_1
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_0
c  in DIMACS:
-5441  5442 -5443 -530 -5444 0
-5441  5442 -5443 -530 -5445 0
-5441  5442 -5443 -530 -5446 0

c  0+1 --> 1
c    (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧  p_530) -> (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0)
c  in CNF:
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_2
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_1
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨  b^{2, 266}_0
c  in DIMACS:
 5441  5442  5443 -530 -5444 0
 5441  5442  5443 -530 -5445 0
 5441  5442  5443 -530  5446 0

c  1+1 --> 2
c    (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0 ∧  p_530) -> (-b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0)
c  in CNF:
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_2
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨  b^{2, 266}_1
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ -p_530 ∨ -b^{2, 266}_0
c  in DIMACS:
 5441  5442 -5443 -530 -5444 0
 5441  5442 -5443 -530  5445 0
 5441  5442 -5443 -530 -5446 0

c  2+1 --> break 
c    (-b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧  p_530) -> break
c  in CNF:
c     b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 5441 -5442  5443 -530 1162 0


c  2-1 --> 1
c    (-b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧ -p_530) -> (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0)
c  in CNF:
c     b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_2
c     b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_1
c     b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨  b^{2, 266}_0
c  in DIMACS:
 5441 -5442  5443  530 -5444 0
 5441 -5442  5443  530 -5445 0
 5441 -5442  5443  530  5446 0

c  1-1 --> 0
c    (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0 ∧ -p_530) -> (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧ -b^{2, 266}_0)
c  in CNF:
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_2
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_1
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_0
c  in DIMACS:
 5441  5442 -5443  530 -5444 0
 5441  5442 -5443  530 -5445 0
 5441  5442 -5443  530 -5446 0

c  0-1 --> -1
c    (-b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧ -p_530) -> ( b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0)
c  in CNF:
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨  b^{2, 266}_2
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_1
c     b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨  b^{2, 266}_0
c  in DIMACS:
 5441  5442  5443  530  5444 0
 5441  5442  5443  530 -5445 0
 5441  5442  5443  530  5446 0

c  -1-1 --> -2
c    ( b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧  b^{2, 265}_0 ∧ -p_530) -> ( b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0)
c  in CNF:
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨  b^{2, 266}_2
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨  b^{2, 266}_1
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨  p_530 ∨ -b^{2, 266}_0
c  in DIMACS:
-5441  5442 -5443  530  5444 0
-5441  5442 -5443  530  5445 0
-5441  5442 -5443  530 -5446 0

c  -2-1 --> break 
c    ( b^{2, 265}_2 ∧  b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨  b^{2, 265}_0 ∨  p_530 ∨ break
c  in DIMACS:
-5441 -5442  5443  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 265}_2 ∧ -b^{2, 265}_1 ∧ -b^{2, 265}_0 ∧ true) 
c  in CNF:
c    -b^{2, 265}_2 ∨  b^{2, 265}_1 ∨  b^{2, 265}_0 ∨ false 
c  in DIMACS:
-5441  5442  5443  0

c  3 does not represent an automaton state.
c    -(-b^{2, 265}_2 ∧  b^{2, 265}_1 ∧  b^{2, 265}_0 ∧ true) 
c  in CNF:
c     b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ false 
c  in DIMACS:
 5441 -5442 -5443  0
c  -3 does not represent an automaton state.
c    -( b^{2, 265}_2 ∧  b^{2, 265}_1 ∧  b^{2, 265}_0 ∧ true) 
c  in CNF:
c    -b^{2, 265}_2 ∨ -b^{2, 265}_1 ∨ -b^{2, 265}_0 ∨ false 
c  in DIMACS:
-5441 -5442 -5443  0

c i = 266
c  -2+1 --> -1
c    ( b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧  p_532) -> ( b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0)
c  in CNF:
c    -b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨  b^{2, 267}_2
c    -b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_1
c    -b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨  b^{2, 267}_0
c  in DIMACS:
-5444 -5445  5446 -532  5447 0
-5444 -5445  5446 -532 -5448 0
-5444 -5445  5446 -532  5449 0

c  -1+1 --> 0
c    ( b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0 ∧  p_532) -> (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧ -b^{2, 267}_0)
c  in CNF:
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_2
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_1
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_0
c  in DIMACS:
-5444  5445 -5446 -532 -5447 0
-5444  5445 -5446 -532 -5448 0
-5444  5445 -5446 -532 -5449 0

c  0+1 --> 1
c    (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧  p_532) -> (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0)
c  in CNF:
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_2
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_1
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨  b^{2, 267}_0
c  in DIMACS:
 5444  5445  5446 -532 -5447 0
 5444  5445  5446 -532 -5448 0
 5444  5445  5446 -532  5449 0

c  1+1 --> 2
c    (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0 ∧  p_532) -> (-b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0)
c  in CNF:
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_2
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨  b^{2, 267}_1
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ -p_532 ∨ -b^{2, 267}_0
c  in DIMACS:
 5444  5445 -5446 -532 -5447 0
 5444  5445 -5446 -532  5448 0
 5444  5445 -5446 -532 -5449 0

c  2+1 --> break 
c    (-b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧  p_532) -> break
c  in CNF:
c     b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 5444 -5445  5446 -532 1162 0


c  2-1 --> 1
c    (-b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧ -p_532) -> (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0)
c  in CNF:
c     b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_2
c     b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_1
c     b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨  b^{2, 267}_0
c  in DIMACS:
 5444 -5445  5446  532 -5447 0
 5444 -5445  5446  532 -5448 0
 5444 -5445  5446  532  5449 0

c  1-1 --> 0
c    (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0 ∧ -p_532) -> (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧ -b^{2, 267}_0)
c  in CNF:
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_2
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_1
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_0
c  in DIMACS:
 5444  5445 -5446  532 -5447 0
 5444  5445 -5446  532 -5448 0
 5444  5445 -5446  532 -5449 0

c  0-1 --> -1
c    (-b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧ -p_532) -> ( b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0)
c  in CNF:
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨  b^{2, 267}_2
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_1
c     b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨  b^{2, 267}_0
c  in DIMACS:
 5444  5445  5446  532  5447 0
 5444  5445  5446  532 -5448 0
 5444  5445  5446  532  5449 0

c  -1-1 --> -2
c    ( b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧  b^{2, 266}_0 ∧ -p_532) -> ( b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0)
c  in CNF:
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨  b^{2, 267}_2
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨  b^{2, 267}_1
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨  p_532 ∨ -b^{2, 267}_0
c  in DIMACS:
-5444  5445 -5446  532  5447 0
-5444  5445 -5446  532  5448 0
-5444  5445 -5446  532 -5449 0

c  -2-1 --> break 
c    ( b^{2, 266}_2 ∧  b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨  b^{2, 266}_0 ∨  p_532 ∨ break
c  in DIMACS:
-5444 -5445  5446  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 266}_2 ∧ -b^{2, 266}_1 ∧ -b^{2, 266}_0 ∧ true) 
c  in CNF:
c    -b^{2, 266}_2 ∨  b^{2, 266}_1 ∨  b^{2, 266}_0 ∨ false 
c  in DIMACS:
-5444  5445  5446  0

c  3 does not represent an automaton state.
c    -(-b^{2, 266}_2 ∧  b^{2, 266}_1 ∧  b^{2, 266}_0 ∧ true) 
c  in CNF:
c     b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ false 
c  in DIMACS:
 5444 -5445 -5446  0
c  -3 does not represent an automaton state.
c    -( b^{2, 266}_2 ∧  b^{2, 266}_1 ∧  b^{2, 266}_0 ∧ true) 
c  in CNF:
c    -b^{2, 266}_2 ∨ -b^{2, 266}_1 ∨ -b^{2, 266}_0 ∨ false 
c  in DIMACS:
-5444 -5445 -5446  0

c i = 267
c  -2+1 --> -1
c    ( b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧  p_534) -> ( b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0)
c  in CNF:
c    -b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨  b^{2, 268}_2
c    -b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_1
c    -b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨  b^{2, 268}_0
c  in DIMACS:
-5447 -5448  5449 -534  5450 0
-5447 -5448  5449 -534 -5451 0
-5447 -5448  5449 -534  5452 0

c  -1+1 --> 0
c    ( b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0 ∧  p_534) -> (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧ -b^{2, 268}_0)
c  in CNF:
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_2
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_1
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_0
c  in DIMACS:
-5447  5448 -5449 -534 -5450 0
-5447  5448 -5449 -534 -5451 0
-5447  5448 -5449 -534 -5452 0

c  0+1 --> 1
c    (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧  p_534) -> (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0)
c  in CNF:
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_2
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_1
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨  b^{2, 268}_0
c  in DIMACS:
 5447  5448  5449 -534 -5450 0
 5447  5448  5449 -534 -5451 0
 5447  5448  5449 -534  5452 0

c  1+1 --> 2
c    (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0 ∧  p_534) -> (-b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0)
c  in CNF:
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_2
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨  b^{2, 268}_1
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ -p_534 ∨ -b^{2, 268}_0
c  in DIMACS:
 5447  5448 -5449 -534 -5450 0
 5447  5448 -5449 -534  5451 0
 5447  5448 -5449 -534 -5452 0

c  2+1 --> break 
c    (-b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧  p_534) -> break
c  in CNF:
c     b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 5447 -5448  5449 -534 1162 0


c  2-1 --> 1
c    (-b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧ -p_534) -> (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0)
c  in CNF:
c     b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_2
c     b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_1
c     b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨  b^{2, 268}_0
c  in DIMACS:
 5447 -5448  5449  534 -5450 0
 5447 -5448  5449  534 -5451 0
 5447 -5448  5449  534  5452 0

c  1-1 --> 0
c    (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0 ∧ -p_534) -> (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧ -b^{2, 268}_0)
c  in CNF:
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_2
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_1
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_0
c  in DIMACS:
 5447  5448 -5449  534 -5450 0
 5447  5448 -5449  534 -5451 0
 5447  5448 -5449  534 -5452 0

c  0-1 --> -1
c    (-b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧ -p_534) -> ( b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0)
c  in CNF:
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨  b^{2, 268}_2
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_1
c     b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨  b^{2, 268}_0
c  in DIMACS:
 5447  5448  5449  534  5450 0
 5447  5448  5449  534 -5451 0
 5447  5448  5449  534  5452 0

c  -1-1 --> -2
c    ( b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧  b^{2, 267}_0 ∧ -p_534) -> ( b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0)
c  in CNF:
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨  b^{2, 268}_2
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨  b^{2, 268}_1
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨  p_534 ∨ -b^{2, 268}_0
c  in DIMACS:
-5447  5448 -5449  534  5450 0
-5447  5448 -5449  534  5451 0
-5447  5448 -5449  534 -5452 0

c  -2-1 --> break 
c    ( b^{2, 267}_2 ∧  b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨  b^{2, 267}_0 ∨  p_534 ∨ break
c  in DIMACS:
-5447 -5448  5449  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 267}_2 ∧ -b^{2, 267}_1 ∧ -b^{2, 267}_0 ∧ true) 
c  in CNF:
c    -b^{2, 267}_2 ∨  b^{2, 267}_1 ∨  b^{2, 267}_0 ∨ false 
c  in DIMACS:
-5447  5448  5449  0

c  3 does not represent an automaton state.
c    -(-b^{2, 267}_2 ∧  b^{2, 267}_1 ∧  b^{2, 267}_0 ∧ true) 
c  in CNF:
c     b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ false 
c  in DIMACS:
 5447 -5448 -5449  0
c  -3 does not represent an automaton state.
c    -( b^{2, 267}_2 ∧  b^{2, 267}_1 ∧  b^{2, 267}_0 ∧ true) 
c  in CNF:
c    -b^{2, 267}_2 ∨ -b^{2, 267}_1 ∨ -b^{2, 267}_0 ∨ false 
c  in DIMACS:
-5447 -5448 -5449  0

c i = 268
c  -2+1 --> -1
c    ( b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧  p_536) -> ( b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0)
c  in CNF:
c    -b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨  b^{2, 269}_2
c    -b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_1
c    -b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨  b^{2, 269}_0
c  in DIMACS:
-5450 -5451  5452 -536  5453 0
-5450 -5451  5452 -536 -5454 0
-5450 -5451  5452 -536  5455 0

c  -1+1 --> 0
c    ( b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0 ∧  p_536) -> (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧ -b^{2, 269}_0)
c  in CNF:
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_2
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_1
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_0
c  in DIMACS:
-5450  5451 -5452 -536 -5453 0
-5450  5451 -5452 -536 -5454 0
-5450  5451 -5452 -536 -5455 0

c  0+1 --> 1
c    (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧  p_536) -> (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0)
c  in CNF:
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_2
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_1
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨  b^{2, 269}_0
c  in DIMACS:
 5450  5451  5452 -536 -5453 0
 5450  5451  5452 -536 -5454 0
 5450  5451  5452 -536  5455 0

c  1+1 --> 2
c    (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0 ∧  p_536) -> (-b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0)
c  in CNF:
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_2
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨  b^{2, 269}_1
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ -p_536 ∨ -b^{2, 269}_0
c  in DIMACS:
 5450  5451 -5452 -536 -5453 0
 5450  5451 -5452 -536  5454 0
 5450  5451 -5452 -536 -5455 0

c  2+1 --> break 
c    (-b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧  p_536) -> break
c  in CNF:
c     b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 5450 -5451  5452 -536 1162 0


c  2-1 --> 1
c    (-b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧ -p_536) -> (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0)
c  in CNF:
c     b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_2
c     b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_1
c     b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨  b^{2, 269}_0
c  in DIMACS:
 5450 -5451  5452  536 -5453 0
 5450 -5451  5452  536 -5454 0
 5450 -5451  5452  536  5455 0

c  1-1 --> 0
c    (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0 ∧ -p_536) -> (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧ -b^{2, 269}_0)
c  in CNF:
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_2
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_1
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_0
c  in DIMACS:
 5450  5451 -5452  536 -5453 0
 5450  5451 -5452  536 -5454 0
 5450  5451 -5452  536 -5455 0

c  0-1 --> -1
c    (-b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧ -p_536) -> ( b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0)
c  in CNF:
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨  b^{2, 269}_2
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_1
c     b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨  b^{2, 269}_0
c  in DIMACS:
 5450  5451  5452  536  5453 0
 5450  5451  5452  536 -5454 0
 5450  5451  5452  536  5455 0

c  -1-1 --> -2
c    ( b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧  b^{2, 268}_0 ∧ -p_536) -> ( b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0)
c  in CNF:
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨  b^{2, 269}_2
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨  b^{2, 269}_1
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨  p_536 ∨ -b^{2, 269}_0
c  in DIMACS:
-5450  5451 -5452  536  5453 0
-5450  5451 -5452  536  5454 0
-5450  5451 -5452  536 -5455 0

c  -2-1 --> break 
c    ( b^{2, 268}_2 ∧  b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨  b^{2, 268}_0 ∨  p_536 ∨ break
c  in DIMACS:
-5450 -5451  5452  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 268}_2 ∧ -b^{2, 268}_1 ∧ -b^{2, 268}_0 ∧ true) 
c  in CNF:
c    -b^{2, 268}_2 ∨  b^{2, 268}_1 ∨  b^{2, 268}_0 ∨ false 
c  in DIMACS:
-5450  5451  5452  0

c  3 does not represent an automaton state.
c    -(-b^{2, 268}_2 ∧  b^{2, 268}_1 ∧  b^{2, 268}_0 ∧ true) 
c  in CNF:
c     b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ false 
c  in DIMACS:
 5450 -5451 -5452  0
c  -3 does not represent an automaton state.
c    -( b^{2, 268}_2 ∧  b^{2, 268}_1 ∧  b^{2, 268}_0 ∧ true) 
c  in CNF:
c    -b^{2, 268}_2 ∨ -b^{2, 268}_1 ∨ -b^{2, 268}_0 ∨ false 
c  in DIMACS:
-5450 -5451 -5452  0

c i = 269
c  -2+1 --> -1
c    ( b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧  p_538) -> ( b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0)
c  in CNF:
c    -b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨  b^{2, 270}_2
c    -b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_1
c    -b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨  b^{2, 270}_0
c  in DIMACS:
-5453 -5454  5455 -538  5456 0
-5453 -5454  5455 -538 -5457 0
-5453 -5454  5455 -538  5458 0

c  -1+1 --> 0
c    ( b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0 ∧  p_538) -> (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧ -b^{2, 270}_0)
c  in CNF:
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_2
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_1
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_0
c  in DIMACS:
-5453  5454 -5455 -538 -5456 0
-5453  5454 -5455 -538 -5457 0
-5453  5454 -5455 -538 -5458 0

c  0+1 --> 1
c    (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧  p_538) -> (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0)
c  in CNF:
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_2
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_1
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨  b^{2, 270}_0
c  in DIMACS:
 5453  5454  5455 -538 -5456 0
 5453  5454  5455 -538 -5457 0
 5453  5454  5455 -538  5458 0

c  1+1 --> 2
c    (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0 ∧  p_538) -> (-b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0)
c  in CNF:
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_2
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨  b^{2, 270}_1
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ -p_538 ∨ -b^{2, 270}_0
c  in DIMACS:
 5453  5454 -5455 -538 -5456 0
 5453  5454 -5455 -538  5457 0
 5453  5454 -5455 -538 -5458 0

c  2+1 --> break 
c    (-b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧  p_538) -> break
c  in CNF:
c     b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ -p_538 ∨ break
c  in DIMACS:
 5453 -5454  5455 -538 1162 0


c  2-1 --> 1
c    (-b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧ -p_538) -> (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0)
c  in CNF:
c     b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_2
c     b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_1
c     b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨  b^{2, 270}_0
c  in DIMACS:
 5453 -5454  5455  538 -5456 0
 5453 -5454  5455  538 -5457 0
 5453 -5454  5455  538  5458 0

c  1-1 --> 0
c    (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0 ∧ -p_538) -> (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧ -b^{2, 270}_0)
c  in CNF:
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_2
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_1
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_0
c  in DIMACS:
 5453  5454 -5455  538 -5456 0
 5453  5454 -5455  538 -5457 0
 5453  5454 -5455  538 -5458 0

c  0-1 --> -1
c    (-b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧ -p_538) -> ( b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0)
c  in CNF:
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨  b^{2, 270}_2
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_1
c     b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨  b^{2, 270}_0
c  in DIMACS:
 5453  5454  5455  538  5456 0
 5453  5454  5455  538 -5457 0
 5453  5454  5455  538  5458 0

c  -1-1 --> -2
c    ( b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧  b^{2, 269}_0 ∧ -p_538) -> ( b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0)
c  in CNF:
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨  b^{2, 270}_2
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨  b^{2, 270}_1
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨  p_538 ∨ -b^{2, 270}_0
c  in DIMACS:
-5453  5454 -5455  538  5456 0
-5453  5454 -5455  538  5457 0
-5453  5454 -5455  538 -5458 0

c  -2-1 --> break 
c    ( b^{2, 269}_2 ∧  b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧ -p_538) -> break
c  in CNF:
c    -b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨  b^{2, 269}_0 ∨  p_538 ∨ break
c  in DIMACS:
-5453 -5454  5455  538 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 269}_2 ∧ -b^{2, 269}_1 ∧ -b^{2, 269}_0 ∧ true) 
c  in CNF:
c    -b^{2, 269}_2 ∨  b^{2, 269}_1 ∨  b^{2, 269}_0 ∨ false 
c  in DIMACS:
-5453  5454  5455  0

c  3 does not represent an automaton state.
c    -(-b^{2, 269}_2 ∧  b^{2, 269}_1 ∧  b^{2, 269}_0 ∧ true) 
c  in CNF:
c     b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ false 
c  in DIMACS:
 5453 -5454 -5455  0
c  -3 does not represent an automaton state.
c    -( b^{2, 269}_2 ∧  b^{2, 269}_1 ∧  b^{2, 269}_0 ∧ true) 
c  in CNF:
c    -b^{2, 269}_2 ∨ -b^{2, 269}_1 ∨ -b^{2, 269}_0 ∨ false 
c  in DIMACS:
-5453 -5454 -5455  0

c i = 270
c  -2+1 --> -1
c    ( b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧  p_540) -> ( b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0)
c  in CNF:
c    -b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨  b^{2, 271}_2
c    -b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_1
c    -b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨  b^{2, 271}_0
c  in DIMACS:
-5456 -5457  5458 -540  5459 0
-5456 -5457  5458 -540 -5460 0
-5456 -5457  5458 -540  5461 0

c  -1+1 --> 0
c    ( b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0 ∧  p_540) -> (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧ -b^{2, 271}_0)
c  in CNF:
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_2
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_1
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_0
c  in DIMACS:
-5456  5457 -5458 -540 -5459 0
-5456  5457 -5458 -540 -5460 0
-5456  5457 -5458 -540 -5461 0

c  0+1 --> 1
c    (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧  p_540) -> (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0)
c  in CNF:
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_2
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_1
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨  b^{2, 271}_0
c  in DIMACS:
 5456  5457  5458 -540 -5459 0
 5456  5457  5458 -540 -5460 0
 5456  5457  5458 -540  5461 0

c  1+1 --> 2
c    (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0 ∧  p_540) -> (-b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0)
c  in CNF:
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_2
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨  b^{2, 271}_1
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ -p_540 ∨ -b^{2, 271}_0
c  in DIMACS:
 5456  5457 -5458 -540 -5459 0
 5456  5457 -5458 -540  5460 0
 5456  5457 -5458 -540 -5461 0

c  2+1 --> break 
c    (-b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧  p_540) -> break
c  in CNF:
c     b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 5456 -5457  5458 -540 1162 0


c  2-1 --> 1
c    (-b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧ -p_540) -> (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0)
c  in CNF:
c     b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_2
c     b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_1
c     b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨  b^{2, 271}_0
c  in DIMACS:
 5456 -5457  5458  540 -5459 0
 5456 -5457  5458  540 -5460 0
 5456 -5457  5458  540  5461 0

c  1-1 --> 0
c    (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0 ∧ -p_540) -> (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧ -b^{2, 271}_0)
c  in CNF:
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_2
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_1
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_0
c  in DIMACS:
 5456  5457 -5458  540 -5459 0
 5456  5457 -5458  540 -5460 0
 5456  5457 -5458  540 -5461 0

c  0-1 --> -1
c    (-b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧ -p_540) -> ( b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0)
c  in CNF:
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨  b^{2, 271}_2
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_1
c     b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨  b^{2, 271}_0
c  in DIMACS:
 5456  5457  5458  540  5459 0
 5456  5457  5458  540 -5460 0
 5456  5457  5458  540  5461 0

c  -1-1 --> -2
c    ( b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧  b^{2, 270}_0 ∧ -p_540) -> ( b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0)
c  in CNF:
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨  b^{2, 271}_2
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨  b^{2, 271}_1
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨  p_540 ∨ -b^{2, 271}_0
c  in DIMACS:
-5456  5457 -5458  540  5459 0
-5456  5457 -5458  540  5460 0
-5456  5457 -5458  540 -5461 0

c  -2-1 --> break 
c    ( b^{2, 270}_2 ∧  b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨  b^{2, 270}_0 ∨  p_540 ∨ break
c  in DIMACS:
-5456 -5457  5458  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 270}_2 ∧ -b^{2, 270}_1 ∧ -b^{2, 270}_0 ∧ true) 
c  in CNF:
c    -b^{2, 270}_2 ∨  b^{2, 270}_1 ∨  b^{2, 270}_0 ∨ false 
c  in DIMACS:
-5456  5457  5458  0

c  3 does not represent an automaton state.
c    -(-b^{2, 270}_2 ∧  b^{2, 270}_1 ∧  b^{2, 270}_0 ∧ true) 
c  in CNF:
c     b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ false 
c  in DIMACS:
 5456 -5457 -5458  0
c  -3 does not represent an automaton state.
c    -( b^{2, 270}_2 ∧  b^{2, 270}_1 ∧  b^{2, 270}_0 ∧ true) 
c  in CNF:
c    -b^{2, 270}_2 ∨ -b^{2, 270}_1 ∨ -b^{2, 270}_0 ∨ false 
c  in DIMACS:
-5456 -5457 -5458  0

c i = 271
c  -2+1 --> -1
c    ( b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧  p_542) -> ( b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0)
c  in CNF:
c    -b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨  b^{2, 272}_2
c    -b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_1
c    -b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨  b^{2, 272}_0
c  in DIMACS:
-5459 -5460  5461 -542  5462 0
-5459 -5460  5461 -542 -5463 0
-5459 -5460  5461 -542  5464 0

c  -1+1 --> 0
c    ( b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0 ∧  p_542) -> (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧ -b^{2, 272}_0)
c  in CNF:
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_2
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_1
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_0
c  in DIMACS:
-5459  5460 -5461 -542 -5462 0
-5459  5460 -5461 -542 -5463 0
-5459  5460 -5461 -542 -5464 0

c  0+1 --> 1
c    (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧  p_542) -> (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0)
c  in CNF:
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_2
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_1
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨  b^{2, 272}_0
c  in DIMACS:
 5459  5460  5461 -542 -5462 0
 5459  5460  5461 -542 -5463 0
 5459  5460  5461 -542  5464 0

c  1+1 --> 2
c    (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0 ∧  p_542) -> (-b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0)
c  in CNF:
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_2
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨  b^{2, 272}_1
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ -p_542 ∨ -b^{2, 272}_0
c  in DIMACS:
 5459  5460 -5461 -542 -5462 0
 5459  5460 -5461 -542  5463 0
 5459  5460 -5461 -542 -5464 0

c  2+1 --> break 
c    (-b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧  p_542) -> break
c  in CNF:
c     b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ -p_542 ∨ break
c  in DIMACS:
 5459 -5460  5461 -542 1162 0


c  2-1 --> 1
c    (-b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧ -p_542) -> (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0)
c  in CNF:
c     b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_2
c     b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_1
c     b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨  b^{2, 272}_0
c  in DIMACS:
 5459 -5460  5461  542 -5462 0
 5459 -5460  5461  542 -5463 0
 5459 -5460  5461  542  5464 0

c  1-1 --> 0
c    (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0 ∧ -p_542) -> (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧ -b^{2, 272}_0)
c  in CNF:
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_2
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_1
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_0
c  in DIMACS:
 5459  5460 -5461  542 -5462 0
 5459  5460 -5461  542 -5463 0
 5459  5460 -5461  542 -5464 0

c  0-1 --> -1
c    (-b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧ -p_542) -> ( b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0)
c  in CNF:
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨  b^{2, 272}_2
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_1
c     b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨  b^{2, 272}_0
c  in DIMACS:
 5459  5460  5461  542  5462 0
 5459  5460  5461  542 -5463 0
 5459  5460  5461  542  5464 0

c  -1-1 --> -2
c    ( b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧  b^{2, 271}_0 ∧ -p_542) -> ( b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0)
c  in CNF:
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨  b^{2, 272}_2
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨  b^{2, 272}_1
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨  p_542 ∨ -b^{2, 272}_0
c  in DIMACS:
-5459  5460 -5461  542  5462 0
-5459  5460 -5461  542  5463 0
-5459  5460 -5461  542 -5464 0

c  -2-1 --> break 
c    ( b^{2, 271}_2 ∧  b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧ -p_542) -> break
c  in CNF:
c    -b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨  b^{2, 271}_0 ∨  p_542 ∨ break
c  in DIMACS:
-5459 -5460  5461  542 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 271}_2 ∧ -b^{2, 271}_1 ∧ -b^{2, 271}_0 ∧ true) 
c  in CNF:
c    -b^{2, 271}_2 ∨  b^{2, 271}_1 ∨  b^{2, 271}_0 ∨ false 
c  in DIMACS:
-5459  5460  5461  0

c  3 does not represent an automaton state.
c    -(-b^{2, 271}_2 ∧  b^{2, 271}_1 ∧  b^{2, 271}_0 ∧ true) 
c  in CNF:
c     b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ false 
c  in DIMACS:
 5459 -5460 -5461  0
c  -3 does not represent an automaton state.
c    -( b^{2, 271}_2 ∧  b^{2, 271}_1 ∧  b^{2, 271}_0 ∧ true) 
c  in CNF:
c    -b^{2, 271}_2 ∨ -b^{2, 271}_1 ∨ -b^{2, 271}_0 ∨ false 
c  in DIMACS:
-5459 -5460 -5461  0

c i = 272
c  -2+1 --> -1
c    ( b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧  p_544) -> ( b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0)
c  in CNF:
c    -b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨  b^{2, 273}_2
c    -b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_1
c    -b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨  b^{2, 273}_0
c  in DIMACS:
-5462 -5463  5464 -544  5465 0
-5462 -5463  5464 -544 -5466 0
-5462 -5463  5464 -544  5467 0

c  -1+1 --> 0
c    ( b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0 ∧  p_544) -> (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧ -b^{2, 273}_0)
c  in CNF:
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_2
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_1
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_0
c  in DIMACS:
-5462  5463 -5464 -544 -5465 0
-5462  5463 -5464 -544 -5466 0
-5462  5463 -5464 -544 -5467 0

c  0+1 --> 1
c    (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧  p_544) -> (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0)
c  in CNF:
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_2
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_1
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨  b^{2, 273}_0
c  in DIMACS:
 5462  5463  5464 -544 -5465 0
 5462  5463  5464 -544 -5466 0
 5462  5463  5464 -544  5467 0

c  1+1 --> 2
c    (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0 ∧  p_544) -> (-b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0)
c  in CNF:
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_2
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨  b^{2, 273}_1
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ -p_544 ∨ -b^{2, 273}_0
c  in DIMACS:
 5462  5463 -5464 -544 -5465 0
 5462  5463 -5464 -544  5466 0
 5462  5463 -5464 -544 -5467 0

c  2+1 --> break 
c    (-b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧  p_544) -> break
c  in CNF:
c     b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 5462 -5463  5464 -544 1162 0


c  2-1 --> 1
c    (-b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧ -p_544) -> (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0)
c  in CNF:
c     b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_2
c     b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_1
c     b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨  b^{2, 273}_0
c  in DIMACS:
 5462 -5463  5464  544 -5465 0
 5462 -5463  5464  544 -5466 0
 5462 -5463  5464  544  5467 0

c  1-1 --> 0
c    (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0 ∧ -p_544) -> (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧ -b^{2, 273}_0)
c  in CNF:
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_2
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_1
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_0
c  in DIMACS:
 5462  5463 -5464  544 -5465 0
 5462  5463 -5464  544 -5466 0
 5462  5463 -5464  544 -5467 0

c  0-1 --> -1
c    (-b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧ -p_544) -> ( b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0)
c  in CNF:
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨  b^{2, 273}_2
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_1
c     b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨  b^{2, 273}_0
c  in DIMACS:
 5462  5463  5464  544  5465 0
 5462  5463  5464  544 -5466 0
 5462  5463  5464  544  5467 0

c  -1-1 --> -2
c    ( b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧  b^{2, 272}_0 ∧ -p_544) -> ( b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0)
c  in CNF:
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨  b^{2, 273}_2
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨  b^{2, 273}_1
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨  p_544 ∨ -b^{2, 273}_0
c  in DIMACS:
-5462  5463 -5464  544  5465 0
-5462  5463 -5464  544  5466 0
-5462  5463 -5464  544 -5467 0

c  -2-1 --> break 
c    ( b^{2, 272}_2 ∧  b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨  b^{2, 272}_0 ∨  p_544 ∨ break
c  in DIMACS:
-5462 -5463  5464  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 272}_2 ∧ -b^{2, 272}_1 ∧ -b^{2, 272}_0 ∧ true) 
c  in CNF:
c    -b^{2, 272}_2 ∨  b^{2, 272}_1 ∨  b^{2, 272}_0 ∨ false 
c  in DIMACS:
-5462  5463  5464  0

c  3 does not represent an automaton state.
c    -(-b^{2, 272}_2 ∧  b^{2, 272}_1 ∧  b^{2, 272}_0 ∧ true) 
c  in CNF:
c     b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ false 
c  in DIMACS:
 5462 -5463 -5464  0
c  -3 does not represent an automaton state.
c    -( b^{2, 272}_2 ∧  b^{2, 272}_1 ∧  b^{2, 272}_0 ∧ true) 
c  in CNF:
c    -b^{2, 272}_2 ∨ -b^{2, 272}_1 ∨ -b^{2, 272}_0 ∨ false 
c  in DIMACS:
-5462 -5463 -5464  0

c i = 273
c  -2+1 --> -1
c    ( b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧  p_546) -> ( b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0)
c  in CNF:
c    -b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨  b^{2, 274}_2
c    -b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_1
c    -b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨  b^{2, 274}_0
c  in DIMACS:
-5465 -5466  5467 -546  5468 0
-5465 -5466  5467 -546 -5469 0
-5465 -5466  5467 -546  5470 0

c  -1+1 --> 0
c    ( b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0 ∧  p_546) -> (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧ -b^{2, 274}_0)
c  in CNF:
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_2
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_1
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_0
c  in DIMACS:
-5465  5466 -5467 -546 -5468 0
-5465  5466 -5467 -546 -5469 0
-5465  5466 -5467 -546 -5470 0

c  0+1 --> 1
c    (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧  p_546) -> (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0)
c  in CNF:
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_2
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_1
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨  b^{2, 274}_0
c  in DIMACS:
 5465  5466  5467 -546 -5468 0
 5465  5466  5467 -546 -5469 0
 5465  5466  5467 -546  5470 0

c  1+1 --> 2
c    (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0 ∧  p_546) -> (-b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0)
c  in CNF:
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_2
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨  b^{2, 274}_1
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ -p_546 ∨ -b^{2, 274}_0
c  in DIMACS:
 5465  5466 -5467 -546 -5468 0
 5465  5466 -5467 -546  5469 0
 5465  5466 -5467 -546 -5470 0

c  2+1 --> break 
c    (-b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧  p_546) -> break
c  in CNF:
c     b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 5465 -5466  5467 -546 1162 0


c  2-1 --> 1
c    (-b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧ -p_546) -> (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0)
c  in CNF:
c     b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_2
c     b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_1
c     b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨  b^{2, 274}_0
c  in DIMACS:
 5465 -5466  5467  546 -5468 0
 5465 -5466  5467  546 -5469 0
 5465 -5466  5467  546  5470 0

c  1-1 --> 0
c    (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0 ∧ -p_546) -> (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧ -b^{2, 274}_0)
c  in CNF:
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_2
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_1
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_0
c  in DIMACS:
 5465  5466 -5467  546 -5468 0
 5465  5466 -5467  546 -5469 0
 5465  5466 -5467  546 -5470 0

c  0-1 --> -1
c    (-b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧ -p_546) -> ( b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0)
c  in CNF:
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨  b^{2, 274}_2
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_1
c     b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨  b^{2, 274}_0
c  in DIMACS:
 5465  5466  5467  546  5468 0
 5465  5466  5467  546 -5469 0
 5465  5466  5467  546  5470 0

c  -1-1 --> -2
c    ( b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧  b^{2, 273}_0 ∧ -p_546) -> ( b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0)
c  in CNF:
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨  b^{2, 274}_2
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨  b^{2, 274}_1
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨  p_546 ∨ -b^{2, 274}_0
c  in DIMACS:
-5465  5466 -5467  546  5468 0
-5465  5466 -5467  546  5469 0
-5465  5466 -5467  546 -5470 0

c  -2-1 --> break 
c    ( b^{2, 273}_2 ∧  b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨  b^{2, 273}_0 ∨  p_546 ∨ break
c  in DIMACS:
-5465 -5466  5467  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 273}_2 ∧ -b^{2, 273}_1 ∧ -b^{2, 273}_0 ∧ true) 
c  in CNF:
c    -b^{2, 273}_2 ∨  b^{2, 273}_1 ∨  b^{2, 273}_0 ∨ false 
c  in DIMACS:
-5465  5466  5467  0

c  3 does not represent an automaton state.
c    -(-b^{2, 273}_2 ∧  b^{2, 273}_1 ∧  b^{2, 273}_0 ∧ true) 
c  in CNF:
c     b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ false 
c  in DIMACS:
 5465 -5466 -5467  0
c  -3 does not represent an automaton state.
c    -( b^{2, 273}_2 ∧  b^{2, 273}_1 ∧  b^{2, 273}_0 ∧ true) 
c  in CNF:
c    -b^{2, 273}_2 ∨ -b^{2, 273}_1 ∨ -b^{2, 273}_0 ∨ false 
c  in DIMACS:
-5465 -5466 -5467  0

c i = 274
c  -2+1 --> -1
c    ( b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧  p_548) -> ( b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0)
c  in CNF:
c    -b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨  b^{2, 275}_2
c    -b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_1
c    -b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨  b^{2, 275}_0
c  in DIMACS:
-5468 -5469  5470 -548  5471 0
-5468 -5469  5470 -548 -5472 0
-5468 -5469  5470 -548  5473 0

c  -1+1 --> 0
c    ( b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0 ∧  p_548) -> (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧ -b^{2, 275}_0)
c  in CNF:
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_2
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_1
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_0
c  in DIMACS:
-5468  5469 -5470 -548 -5471 0
-5468  5469 -5470 -548 -5472 0
-5468  5469 -5470 -548 -5473 0

c  0+1 --> 1
c    (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧  p_548) -> (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0)
c  in CNF:
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_2
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_1
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨  b^{2, 275}_0
c  in DIMACS:
 5468  5469  5470 -548 -5471 0
 5468  5469  5470 -548 -5472 0
 5468  5469  5470 -548  5473 0

c  1+1 --> 2
c    (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0 ∧  p_548) -> (-b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0)
c  in CNF:
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_2
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨  b^{2, 275}_1
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ -p_548 ∨ -b^{2, 275}_0
c  in DIMACS:
 5468  5469 -5470 -548 -5471 0
 5468  5469 -5470 -548  5472 0
 5468  5469 -5470 -548 -5473 0

c  2+1 --> break 
c    (-b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧  p_548) -> break
c  in CNF:
c     b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ -p_548 ∨ break
c  in DIMACS:
 5468 -5469  5470 -548 1162 0


c  2-1 --> 1
c    (-b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧ -p_548) -> (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0)
c  in CNF:
c     b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_2
c     b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_1
c     b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨  b^{2, 275}_0
c  in DIMACS:
 5468 -5469  5470  548 -5471 0
 5468 -5469  5470  548 -5472 0
 5468 -5469  5470  548  5473 0

c  1-1 --> 0
c    (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0 ∧ -p_548) -> (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧ -b^{2, 275}_0)
c  in CNF:
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_2
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_1
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_0
c  in DIMACS:
 5468  5469 -5470  548 -5471 0
 5468  5469 -5470  548 -5472 0
 5468  5469 -5470  548 -5473 0

c  0-1 --> -1
c    (-b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧ -p_548) -> ( b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0)
c  in CNF:
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨  b^{2, 275}_2
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_1
c     b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨  b^{2, 275}_0
c  in DIMACS:
 5468  5469  5470  548  5471 0
 5468  5469  5470  548 -5472 0
 5468  5469  5470  548  5473 0

c  -1-1 --> -2
c    ( b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧  b^{2, 274}_0 ∧ -p_548) -> ( b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0)
c  in CNF:
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨  b^{2, 275}_2
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨  b^{2, 275}_1
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨  p_548 ∨ -b^{2, 275}_0
c  in DIMACS:
-5468  5469 -5470  548  5471 0
-5468  5469 -5470  548  5472 0
-5468  5469 -5470  548 -5473 0

c  -2-1 --> break 
c    ( b^{2, 274}_2 ∧  b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧ -p_548) -> break
c  in CNF:
c    -b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨  b^{2, 274}_0 ∨  p_548 ∨ break
c  in DIMACS:
-5468 -5469  5470  548 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 274}_2 ∧ -b^{2, 274}_1 ∧ -b^{2, 274}_0 ∧ true) 
c  in CNF:
c    -b^{2, 274}_2 ∨  b^{2, 274}_1 ∨  b^{2, 274}_0 ∨ false 
c  in DIMACS:
-5468  5469  5470  0

c  3 does not represent an automaton state.
c    -(-b^{2, 274}_2 ∧  b^{2, 274}_1 ∧  b^{2, 274}_0 ∧ true) 
c  in CNF:
c     b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ false 
c  in DIMACS:
 5468 -5469 -5470  0
c  -3 does not represent an automaton state.
c    -( b^{2, 274}_2 ∧  b^{2, 274}_1 ∧  b^{2, 274}_0 ∧ true) 
c  in CNF:
c    -b^{2, 274}_2 ∨ -b^{2, 274}_1 ∨ -b^{2, 274}_0 ∨ false 
c  in DIMACS:
-5468 -5469 -5470  0

c i = 275
c  -2+1 --> -1
c    ( b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧  p_550) -> ( b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0)
c  in CNF:
c    -b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨  b^{2, 276}_2
c    -b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_1
c    -b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨  b^{2, 276}_0
c  in DIMACS:
-5471 -5472  5473 -550  5474 0
-5471 -5472  5473 -550 -5475 0
-5471 -5472  5473 -550  5476 0

c  -1+1 --> 0
c    ( b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0 ∧  p_550) -> (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧ -b^{2, 276}_0)
c  in CNF:
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_2
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_1
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_0
c  in DIMACS:
-5471  5472 -5473 -550 -5474 0
-5471  5472 -5473 -550 -5475 0
-5471  5472 -5473 -550 -5476 0

c  0+1 --> 1
c    (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧  p_550) -> (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0)
c  in CNF:
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_2
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_1
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨  b^{2, 276}_0
c  in DIMACS:
 5471  5472  5473 -550 -5474 0
 5471  5472  5473 -550 -5475 0
 5471  5472  5473 -550  5476 0

c  1+1 --> 2
c    (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0 ∧  p_550) -> (-b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0)
c  in CNF:
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_2
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨  b^{2, 276}_1
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ -p_550 ∨ -b^{2, 276}_0
c  in DIMACS:
 5471  5472 -5473 -550 -5474 0
 5471  5472 -5473 -550  5475 0
 5471  5472 -5473 -550 -5476 0

c  2+1 --> break 
c    (-b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧  p_550) -> break
c  in CNF:
c     b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 5471 -5472  5473 -550 1162 0


c  2-1 --> 1
c    (-b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧ -p_550) -> (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0)
c  in CNF:
c     b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_2
c     b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_1
c     b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨  b^{2, 276}_0
c  in DIMACS:
 5471 -5472  5473  550 -5474 0
 5471 -5472  5473  550 -5475 0
 5471 -5472  5473  550  5476 0

c  1-1 --> 0
c    (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0 ∧ -p_550) -> (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧ -b^{2, 276}_0)
c  in CNF:
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_2
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_1
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_0
c  in DIMACS:
 5471  5472 -5473  550 -5474 0
 5471  5472 -5473  550 -5475 0
 5471  5472 -5473  550 -5476 0

c  0-1 --> -1
c    (-b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧ -p_550) -> ( b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0)
c  in CNF:
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨  b^{2, 276}_2
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_1
c     b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨  b^{2, 276}_0
c  in DIMACS:
 5471  5472  5473  550  5474 0
 5471  5472  5473  550 -5475 0
 5471  5472  5473  550  5476 0

c  -1-1 --> -2
c    ( b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧  b^{2, 275}_0 ∧ -p_550) -> ( b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0)
c  in CNF:
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨  b^{2, 276}_2
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨  b^{2, 276}_1
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨  p_550 ∨ -b^{2, 276}_0
c  in DIMACS:
-5471  5472 -5473  550  5474 0
-5471  5472 -5473  550  5475 0
-5471  5472 -5473  550 -5476 0

c  -2-1 --> break 
c    ( b^{2, 275}_2 ∧  b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨  b^{2, 275}_0 ∨  p_550 ∨ break
c  in DIMACS:
-5471 -5472  5473  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 275}_2 ∧ -b^{2, 275}_1 ∧ -b^{2, 275}_0 ∧ true) 
c  in CNF:
c    -b^{2, 275}_2 ∨  b^{2, 275}_1 ∨  b^{2, 275}_0 ∨ false 
c  in DIMACS:
-5471  5472  5473  0

c  3 does not represent an automaton state.
c    -(-b^{2, 275}_2 ∧  b^{2, 275}_1 ∧  b^{2, 275}_0 ∧ true) 
c  in CNF:
c     b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ false 
c  in DIMACS:
 5471 -5472 -5473  0
c  -3 does not represent an automaton state.
c    -( b^{2, 275}_2 ∧  b^{2, 275}_1 ∧  b^{2, 275}_0 ∧ true) 
c  in CNF:
c    -b^{2, 275}_2 ∨ -b^{2, 275}_1 ∨ -b^{2, 275}_0 ∨ false 
c  in DIMACS:
-5471 -5472 -5473  0

c i = 276
c  -2+1 --> -1
c    ( b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧  p_552) -> ( b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0)
c  in CNF:
c    -b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨  b^{2, 277}_2
c    -b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_1
c    -b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨  b^{2, 277}_0
c  in DIMACS:
-5474 -5475  5476 -552  5477 0
-5474 -5475  5476 -552 -5478 0
-5474 -5475  5476 -552  5479 0

c  -1+1 --> 0
c    ( b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0 ∧  p_552) -> (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧ -b^{2, 277}_0)
c  in CNF:
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_2
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_1
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_0
c  in DIMACS:
-5474  5475 -5476 -552 -5477 0
-5474  5475 -5476 -552 -5478 0
-5474  5475 -5476 -552 -5479 0

c  0+1 --> 1
c    (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧  p_552) -> (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0)
c  in CNF:
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_2
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_1
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨  b^{2, 277}_0
c  in DIMACS:
 5474  5475  5476 -552 -5477 0
 5474  5475  5476 -552 -5478 0
 5474  5475  5476 -552  5479 0

c  1+1 --> 2
c    (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0 ∧  p_552) -> (-b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0)
c  in CNF:
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_2
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨  b^{2, 277}_1
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ -p_552 ∨ -b^{2, 277}_0
c  in DIMACS:
 5474  5475 -5476 -552 -5477 0
 5474  5475 -5476 -552  5478 0
 5474  5475 -5476 -552 -5479 0

c  2+1 --> break 
c    (-b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧  p_552) -> break
c  in CNF:
c     b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 5474 -5475  5476 -552 1162 0


c  2-1 --> 1
c    (-b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧ -p_552) -> (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0)
c  in CNF:
c     b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_2
c     b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_1
c     b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨  b^{2, 277}_0
c  in DIMACS:
 5474 -5475  5476  552 -5477 0
 5474 -5475  5476  552 -5478 0
 5474 -5475  5476  552  5479 0

c  1-1 --> 0
c    (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0 ∧ -p_552) -> (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧ -b^{2, 277}_0)
c  in CNF:
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_2
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_1
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_0
c  in DIMACS:
 5474  5475 -5476  552 -5477 0
 5474  5475 -5476  552 -5478 0
 5474  5475 -5476  552 -5479 0

c  0-1 --> -1
c    (-b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧ -p_552) -> ( b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0)
c  in CNF:
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨  b^{2, 277}_2
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_1
c     b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨  b^{2, 277}_0
c  in DIMACS:
 5474  5475  5476  552  5477 0
 5474  5475  5476  552 -5478 0
 5474  5475  5476  552  5479 0

c  -1-1 --> -2
c    ( b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧  b^{2, 276}_0 ∧ -p_552) -> ( b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0)
c  in CNF:
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨  b^{2, 277}_2
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨  b^{2, 277}_1
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨  p_552 ∨ -b^{2, 277}_0
c  in DIMACS:
-5474  5475 -5476  552  5477 0
-5474  5475 -5476  552  5478 0
-5474  5475 -5476  552 -5479 0

c  -2-1 --> break 
c    ( b^{2, 276}_2 ∧  b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨  b^{2, 276}_0 ∨  p_552 ∨ break
c  in DIMACS:
-5474 -5475  5476  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 276}_2 ∧ -b^{2, 276}_1 ∧ -b^{2, 276}_0 ∧ true) 
c  in CNF:
c    -b^{2, 276}_2 ∨  b^{2, 276}_1 ∨  b^{2, 276}_0 ∨ false 
c  in DIMACS:
-5474  5475  5476  0

c  3 does not represent an automaton state.
c    -(-b^{2, 276}_2 ∧  b^{2, 276}_1 ∧  b^{2, 276}_0 ∧ true) 
c  in CNF:
c     b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ false 
c  in DIMACS:
 5474 -5475 -5476  0
c  -3 does not represent an automaton state.
c    -( b^{2, 276}_2 ∧  b^{2, 276}_1 ∧  b^{2, 276}_0 ∧ true) 
c  in CNF:
c    -b^{2, 276}_2 ∨ -b^{2, 276}_1 ∨ -b^{2, 276}_0 ∨ false 
c  in DIMACS:
-5474 -5475 -5476  0

c i = 277
c  -2+1 --> -1
c    ( b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧  p_554) -> ( b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0)
c  in CNF:
c    -b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨  b^{2, 278}_2
c    -b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_1
c    -b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨  b^{2, 278}_0
c  in DIMACS:
-5477 -5478  5479 -554  5480 0
-5477 -5478  5479 -554 -5481 0
-5477 -5478  5479 -554  5482 0

c  -1+1 --> 0
c    ( b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0 ∧  p_554) -> (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧ -b^{2, 278}_0)
c  in CNF:
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_2
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_1
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_0
c  in DIMACS:
-5477  5478 -5479 -554 -5480 0
-5477  5478 -5479 -554 -5481 0
-5477  5478 -5479 -554 -5482 0

c  0+1 --> 1
c    (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧  p_554) -> (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0)
c  in CNF:
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_2
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_1
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨  b^{2, 278}_0
c  in DIMACS:
 5477  5478  5479 -554 -5480 0
 5477  5478  5479 -554 -5481 0
 5477  5478  5479 -554  5482 0

c  1+1 --> 2
c    (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0 ∧  p_554) -> (-b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0)
c  in CNF:
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_2
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨  b^{2, 278}_1
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ -p_554 ∨ -b^{2, 278}_0
c  in DIMACS:
 5477  5478 -5479 -554 -5480 0
 5477  5478 -5479 -554  5481 0
 5477  5478 -5479 -554 -5482 0

c  2+1 --> break 
c    (-b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧  p_554) -> break
c  in CNF:
c     b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ -p_554 ∨ break
c  in DIMACS:
 5477 -5478  5479 -554 1162 0


c  2-1 --> 1
c    (-b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧ -p_554) -> (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0)
c  in CNF:
c     b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_2
c     b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_1
c     b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨  b^{2, 278}_0
c  in DIMACS:
 5477 -5478  5479  554 -5480 0
 5477 -5478  5479  554 -5481 0
 5477 -5478  5479  554  5482 0

c  1-1 --> 0
c    (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0 ∧ -p_554) -> (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧ -b^{2, 278}_0)
c  in CNF:
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_2
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_1
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_0
c  in DIMACS:
 5477  5478 -5479  554 -5480 0
 5477  5478 -5479  554 -5481 0
 5477  5478 -5479  554 -5482 0

c  0-1 --> -1
c    (-b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧ -p_554) -> ( b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0)
c  in CNF:
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨  b^{2, 278}_2
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_1
c     b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨  b^{2, 278}_0
c  in DIMACS:
 5477  5478  5479  554  5480 0
 5477  5478  5479  554 -5481 0
 5477  5478  5479  554  5482 0

c  -1-1 --> -2
c    ( b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧  b^{2, 277}_0 ∧ -p_554) -> ( b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0)
c  in CNF:
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨  b^{2, 278}_2
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨  b^{2, 278}_1
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨  p_554 ∨ -b^{2, 278}_0
c  in DIMACS:
-5477  5478 -5479  554  5480 0
-5477  5478 -5479  554  5481 0
-5477  5478 -5479  554 -5482 0

c  -2-1 --> break 
c    ( b^{2, 277}_2 ∧  b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧ -p_554) -> break
c  in CNF:
c    -b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨  b^{2, 277}_0 ∨  p_554 ∨ break
c  in DIMACS:
-5477 -5478  5479  554 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 277}_2 ∧ -b^{2, 277}_1 ∧ -b^{2, 277}_0 ∧ true) 
c  in CNF:
c    -b^{2, 277}_2 ∨  b^{2, 277}_1 ∨  b^{2, 277}_0 ∨ false 
c  in DIMACS:
-5477  5478  5479  0

c  3 does not represent an automaton state.
c    -(-b^{2, 277}_2 ∧  b^{2, 277}_1 ∧  b^{2, 277}_0 ∧ true) 
c  in CNF:
c     b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ false 
c  in DIMACS:
 5477 -5478 -5479  0
c  -3 does not represent an automaton state.
c    -( b^{2, 277}_2 ∧  b^{2, 277}_1 ∧  b^{2, 277}_0 ∧ true) 
c  in CNF:
c    -b^{2, 277}_2 ∨ -b^{2, 277}_1 ∨ -b^{2, 277}_0 ∨ false 
c  in DIMACS:
-5477 -5478 -5479  0

c i = 278
c  -2+1 --> -1
c    ( b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧  p_556) -> ( b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0)
c  in CNF:
c    -b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨  b^{2, 279}_2
c    -b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_1
c    -b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨  b^{2, 279}_0
c  in DIMACS:
-5480 -5481  5482 -556  5483 0
-5480 -5481  5482 -556 -5484 0
-5480 -5481  5482 -556  5485 0

c  -1+1 --> 0
c    ( b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0 ∧  p_556) -> (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧ -b^{2, 279}_0)
c  in CNF:
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_2
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_1
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_0
c  in DIMACS:
-5480  5481 -5482 -556 -5483 0
-5480  5481 -5482 -556 -5484 0
-5480  5481 -5482 -556 -5485 0

c  0+1 --> 1
c    (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧  p_556) -> (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0)
c  in CNF:
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_2
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_1
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨  b^{2, 279}_0
c  in DIMACS:
 5480  5481  5482 -556 -5483 0
 5480  5481  5482 -556 -5484 0
 5480  5481  5482 -556  5485 0

c  1+1 --> 2
c    (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0 ∧  p_556) -> (-b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0)
c  in CNF:
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_2
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨  b^{2, 279}_1
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ -p_556 ∨ -b^{2, 279}_0
c  in DIMACS:
 5480  5481 -5482 -556 -5483 0
 5480  5481 -5482 -556  5484 0
 5480  5481 -5482 -556 -5485 0

c  2+1 --> break 
c    (-b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧  p_556) -> break
c  in CNF:
c     b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ -p_556 ∨ break
c  in DIMACS:
 5480 -5481  5482 -556 1162 0


c  2-1 --> 1
c    (-b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧ -p_556) -> (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0)
c  in CNF:
c     b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_2
c     b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_1
c     b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨  b^{2, 279}_0
c  in DIMACS:
 5480 -5481  5482  556 -5483 0
 5480 -5481  5482  556 -5484 0
 5480 -5481  5482  556  5485 0

c  1-1 --> 0
c    (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0 ∧ -p_556) -> (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧ -b^{2, 279}_0)
c  in CNF:
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_2
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_1
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_0
c  in DIMACS:
 5480  5481 -5482  556 -5483 0
 5480  5481 -5482  556 -5484 0
 5480  5481 -5482  556 -5485 0

c  0-1 --> -1
c    (-b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧ -p_556) -> ( b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0)
c  in CNF:
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨  b^{2, 279}_2
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_1
c     b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨  b^{2, 279}_0
c  in DIMACS:
 5480  5481  5482  556  5483 0
 5480  5481  5482  556 -5484 0
 5480  5481  5482  556  5485 0

c  -1-1 --> -2
c    ( b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧  b^{2, 278}_0 ∧ -p_556) -> ( b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0)
c  in CNF:
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨  b^{2, 279}_2
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨  b^{2, 279}_1
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨  p_556 ∨ -b^{2, 279}_0
c  in DIMACS:
-5480  5481 -5482  556  5483 0
-5480  5481 -5482  556  5484 0
-5480  5481 -5482  556 -5485 0

c  -2-1 --> break 
c    ( b^{2, 278}_2 ∧  b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧ -p_556) -> break
c  in CNF:
c    -b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨  b^{2, 278}_0 ∨  p_556 ∨ break
c  in DIMACS:
-5480 -5481  5482  556 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 278}_2 ∧ -b^{2, 278}_1 ∧ -b^{2, 278}_0 ∧ true) 
c  in CNF:
c    -b^{2, 278}_2 ∨  b^{2, 278}_1 ∨  b^{2, 278}_0 ∨ false 
c  in DIMACS:
-5480  5481  5482  0

c  3 does not represent an automaton state.
c    -(-b^{2, 278}_2 ∧  b^{2, 278}_1 ∧  b^{2, 278}_0 ∧ true) 
c  in CNF:
c     b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ false 
c  in DIMACS:
 5480 -5481 -5482  0
c  -3 does not represent an automaton state.
c    -( b^{2, 278}_2 ∧  b^{2, 278}_1 ∧  b^{2, 278}_0 ∧ true) 
c  in CNF:
c    -b^{2, 278}_2 ∨ -b^{2, 278}_1 ∨ -b^{2, 278}_0 ∨ false 
c  in DIMACS:
-5480 -5481 -5482  0

c i = 279
c  -2+1 --> -1
c    ( b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧  p_558) -> ( b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0)
c  in CNF:
c    -b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨  b^{2, 280}_2
c    -b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_1
c    -b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨  b^{2, 280}_0
c  in DIMACS:
-5483 -5484  5485 -558  5486 0
-5483 -5484  5485 -558 -5487 0
-5483 -5484  5485 -558  5488 0

c  -1+1 --> 0
c    ( b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0 ∧  p_558) -> (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧ -b^{2, 280}_0)
c  in CNF:
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_2
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_1
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_0
c  in DIMACS:
-5483  5484 -5485 -558 -5486 0
-5483  5484 -5485 -558 -5487 0
-5483  5484 -5485 -558 -5488 0

c  0+1 --> 1
c    (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧  p_558) -> (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0)
c  in CNF:
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_2
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_1
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨  b^{2, 280}_0
c  in DIMACS:
 5483  5484  5485 -558 -5486 0
 5483  5484  5485 -558 -5487 0
 5483  5484  5485 -558  5488 0

c  1+1 --> 2
c    (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0 ∧  p_558) -> (-b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0)
c  in CNF:
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_2
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨  b^{2, 280}_1
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ -p_558 ∨ -b^{2, 280}_0
c  in DIMACS:
 5483  5484 -5485 -558 -5486 0
 5483  5484 -5485 -558  5487 0
 5483  5484 -5485 -558 -5488 0

c  2+1 --> break 
c    (-b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧  p_558) -> break
c  in CNF:
c     b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 5483 -5484  5485 -558 1162 0


c  2-1 --> 1
c    (-b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧ -p_558) -> (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0)
c  in CNF:
c     b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_2
c     b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_1
c     b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨  b^{2, 280}_0
c  in DIMACS:
 5483 -5484  5485  558 -5486 0
 5483 -5484  5485  558 -5487 0
 5483 -5484  5485  558  5488 0

c  1-1 --> 0
c    (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0 ∧ -p_558) -> (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧ -b^{2, 280}_0)
c  in CNF:
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_2
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_1
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_0
c  in DIMACS:
 5483  5484 -5485  558 -5486 0
 5483  5484 -5485  558 -5487 0
 5483  5484 -5485  558 -5488 0

c  0-1 --> -1
c    (-b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧ -p_558) -> ( b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0)
c  in CNF:
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨  b^{2, 280}_2
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_1
c     b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨  b^{2, 280}_0
c  in DIMACS:
 5483  5484  5485  558  5486 0
 5483  5484  5485  558 -5487 0
 5483  5484  5485  558  5488 0

c  -1-1 --> -2
c    ( b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧  b^{2, 279}_0 ∧ -p_558) -> ( b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0)
c  in CNF:
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨  b^{2, 280}_2
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨  b^{2, 280}_1
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨  p_558 ∨ -b^{2, 280}_0
c  in DIMACS:
-5483  5484 -5485  558  5486 0
-5483  5484 -5485  558  5487 0
-5483  5484 -5485  558 -5488 0

c  -2-1 --> break 
c    ( b^{2, 279}_2 ∧  b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨  b^{2, 279}_0 ∨  p_558 ∨ break
c  in DIMACS:
-5483 -5484  5485  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 279}_2 ∧ -b^{2, 279}_1 ∧ -b^{2, 279}_0 ∧ true) 
c  in CNF:
c    -b^{2, 279}_2 ∨  b^{2, 279}_1 ∨  b^{2, 279}_0 ∨ false 
c  in DIMACS:
-5483  5484  5485  0

c  3 does not represent an automaton state.
c    -(-b^{2, 279}_2 ∧  b^{2, 279}_1 ∧  b^{2, 279}_0 ∧ true) 
c  in CNF:
c     b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ false 
c  in DIMACS:
 5483 -5484 -5485  0
c  -3 does not represent an automaton state.
c    -( b^{2, 279}_2 ∧  b^{2, 279}_1 ∧  b^{2, 279}_0 ∧ true) 
c  in CNF:
c    -b^{2, 279}_2 ∨ -b^{2, 279}_1 ∨ -b^{2, 279}_0 ∨ false 
c  in DIMACS:
-5483 -5484 -5485  0

c i = 280
c  -2+1 --> -1
c    ( b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧  p_560) -> ( b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0)
c  in CNF:
c    -b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨  b^{2, 281}_2
c    -b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_1
c    -b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨  b^{2, 281}_0
c  in DIMACS:
-5486 -5487  5488 -560  5489 0
-5486 -5487  5488 -560 -5490 0
-5486 -5487  5488 -560  5491 0

c  -1+1 --> 0
c    ( b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0 ∧  p_560) -> (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧ -b^{2, 281}_0)
c  in CNF:
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_2
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_1
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_0
c  in DIMACS:
-5486  5487 -5488 -560 -5489 0
-5486  5487 -5488 -560 -5490 0
-5486  5487 -5488 -560 -5491 0

c  0+1 --> 1
c    (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧  p_560) -> (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0)
c  in CNF:
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_2
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_1
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨  b^{2, 281}_0
c  in DIMACS:
 5486  5487  5488 -560 -5489 0
 5486  5487  5488 -560 -5490 0
 5486  5487  5488 -560  5491 0

c  1+1 --> 2
c    (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0 ∧  p_560) -> (-b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0)
c  in CNF:
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_2
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨  b^{2, 281}_1
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ -p_560 ∨ -b^{2, 281}_0
c  in DIMACS:
 5486  5487 -5488 -560 -5489 0
 5486  5487 -5488 -560  5490 0
 5486  5487 -5488 -560 -5491 0

c  2+1 --> break 
c    (-b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧  p_560) -> break
c  in CNF:
c     b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 5486 -5487  5488 -560 1162 0


c  2-1 --> 1
c    (-b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧ -p_560) -> (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0)
c  in CNF:
c     b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_2
c     b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_1
c     b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨  b^{2, 281}_0
c  in DIMACS:
 5486 -5487  5488  560 -5489 0
 5486 -5487  5488  560 -5490 0
 5486 -5487  5488  560  5491 0

c  1-1 --> 0
c    (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0 ∧ -p_560) -> (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧ -b^{2, 281}_0)
c  in CNF:
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_2
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_1
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_0
c  in DIMACS:
 5486  5487 -5488  560 -5489 0
 5486  5487 -5488  560 -5490 0
 5486  5487 -5488  560 -5491 0

c  0-1 --> -1
c    (-b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧ -p_560) -> ( b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0)
c  in CNF:
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨  b^{2, 281}_2
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_1
c     b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨  b^{2, 281}_0
c  in DIMACS:
 5486  5487  5488  560  5489 0
 5486  5487  5488  560 -5490 0
 5486  5487  5488  560  5491 0

c  -1-1 --> -2
c    ( b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧  b^{2, 280}_0 ∧ -p_560) -> ( b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0)
c  in CNF:
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨  b^{2, 281}_2
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨  b^{2, 281}_1
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨  p_560 ∨ -b^{2, 281}_0
c  in DIMACS:
-5486  5487 -5488  560  5489 0
-5486  5487 -5488  560  5490 0
-5486  5487 -5488  560 -5491 0

c  -2-1 --> break 
c    ( b^{2, 280}_2 ∧  b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨  b^{2, 280}_0 ∨  p_560 ∨ break
c  in DIMACS:
-5486 -5487  5488  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 280}_2 ∧ -b^{2, 280}_1 ∧ -b^{2, 280}_0 ∧ true) 
c  in CNF:
c    -b^{2, 280}_2 ∨  b^{2, 280}_1 ∨  b^{2, 280}_0 ∨ false 
c  in DIMACS:
-5486  5487  5488  0

c  3 does not represent an automaton state.
c    -(-b^{2, 280}_2 ∧  b^{2, 280}_1 ∧  b^{2, 280}_0 ∧ true) 
c  in CNF:
c     b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ false 
c  in DIMACS:
 5486 -5487 -5488  0
c  -3 does not represent an automaton state.
c    -( b^{2, 280}_2 ∧  b^{2, 280}_1 ∧  b^{2, 280}_0 ∧ true) 
c  in CNF:
c    -b^{2, 280}_2 ∨ -b^{2, 280}_1 ∨ -b^{2, 280}_0 ∨ false 
c  in DIMACS:
-5486 -5487 -5488  0

c i = 281
c  -2+1 --> -1
c    ( b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧  p_562) -> ( b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0)
c  in CNF:
c    -b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨  b^{2, 282}_2
c    -b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_1
c    -b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨  b^{2, 282}_0
c  in DIMACS:
-5489 -5490  5491 -562  5492 0
-5489 -5490  5491 -562 -5493 0
-5489 -5490  5491 -562  5494 0

c  -1+1 --> 0
c    ( b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0 ∧  p_562) -> (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧ -b^{2, 282}_0)
c  in CNF:
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_2
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_1
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_0
c  in DIMACS:
-5489  5490 -5491 -562 -5492 0
-5489  5490 -5491 -562 -5493 0
-5489  5490 -5491 -562 -5494 0

c  0+1 --> 1
c    (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧  p_562) -> (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0)
c  in CNF:
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_2
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_1
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨  b^{2, 282}_0
c  in DIMACS:
 5489  5490  5491 -562 -5492 0
 5489  5490  5491 -562 -5493 0
 5489  5490  5491 -562  5494 0

c  1+1 --> 2
c    (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0 ∧  p_562) -> (-b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0)
c  in CNF:
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_2
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨  b^{2, 282}_1
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ -p_562 ∨ -b^{2, 282}_0
c  in DIMACS:
 5489  5490 -5491 -562 -5492 0
 5489  5490 -5491 -562  5493 0
 5489  5490 -5491 -562 -5494 0

c  2+1 --> break 
c    (-b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧  p_562) -> break
c  in CNF:
c     b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ -p_562 ∨ break
c  in DIMACS:
 5489 -5490  5491 -562 1162 0


c  2-1 --> 1
c    (-b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧ -p_562) -> (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0)
c  in CNF:
c     b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_2
c     b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_1
c     b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨  b^{2, 282}_0
c  in DIMACS:
 5489 -5490  5491  562 -5492 0
 5489 -5490  5491  562 -5493 0
 5489 -5490  5491  562  5494 0

c  1-1 --> 0
c    (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0 ∧ -p_562) -> (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧ -b^{2, 282}_0)
c  in CNF:
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_2
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_1
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_0
c  in DIMACS:
 5489  5490 -5491  562 -5492 0
 5489  5490 -5491  562 -5493 0
 5489  5490 -5491  562 -5494 0

c  0-1 --> -1
c    (-b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧ -p_562) -> ( b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0)
c  in CNF:
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨  b^{2, 282}_2
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_1
c     b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨  b^{2, 282}_0
c  in DIMACS:
 5489  5490  5491  562  5492 0
 5489  5490  5491  562 -5493 0
 5489  5490  5491  562  5494 0

c  -1-1 --> -2
c    ( b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧  b^{2, 281}_0 ∧ -p_562) -> ( b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0)
c  in CNF:
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨  b^{2, 282}_2
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨  b^{2, 282}_1
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨  p_562 ∨ -b^{2, 282}_0
c  in DIMACS:
-5489  5490 -5491  562  5492 0
-5489  5490 -5491  562  5493 0
-5489  5490 -5491  562 -5494 0

c  -2-1 --> break 
c    ( b^{2, 281}_2 ∧  b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧ -p_562) -> break
c  in CNF:
c    -b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨  b^{2, 281}_0 ∨  p_562 ∨ break
c  in DIMACS:
-5489 -5490  5491  562 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 281}_2 ∧ -b^{2, 281}_1 ∧ -b^{2, 281}_0 ∧ true) 
c  in CNF:
c    -b^{2, 281}_2 ∨  b^{2, 281}_1 ∨  b^{2, 281}_0 ∨ false 
c  in DIMACS:
-5489  5490  5491  0

c  3 does not represent an automaton state.
c    -(-b^{2, 281}_2 ∧  b^{2, 281}_1 ∧  b^{2, 281}_0 ∧ true) 
c  in CNF:
c     b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ false 
c  in DIMACS:
 5489 -5490 -5491  0
c  -3 does not represent an automaton state.
c    -( b^{2, 281}_2 ∧  b^{2, 281}_1 ∧  b^{2, 281}_0 ∧ true) 
c  in CNF:
c    -b^{2, 281}_2 ∨ -b^{2, 281}_1 ∨ -b^{2, 281}_0 ∨ false 
c  in DIMACS:
-5489 -5490 -5491  0

c i = 282
c  -2+1 --> -1
c    ( b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧  p_564) -> ( b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0)
c  in CNF:
c    -b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨  b^{2, 283}_2
c    -b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_1
c    -b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨  b^{2, 283}_0
c  in DIMACS:
-5492 -5493  5494 -564  5495 0
-5492 -5493  5494 -564 -5496 0
-5492 -5493  5494 -564  5497 0

c  -1+1 --> 0
c    ( b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0 ∧  p_564) -> (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧ -b^{2, 283}_0)
c  in CNF:
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_2
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_1
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_0
c  in DIMACS:
-5492  5493 -5494 -564 -5495 0
-5492  5493 -5494 -564 -5496 0
-5492  5493 -5494 -564 -5497 0

c  0+1 --> 1
c    (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧  p_564) -> (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0)
c  in CNF:
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_2
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_1
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨  b^{2, 283}_0
c  in DIMACS:
 5492  5493  5494 -564 -5495 0
 5492  5493  5494 -564 -5496 0
 5492  5493  5494 -564  5497 0

c  1+1 --> 2
c    (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0 ∧  p_564) -> (-b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0)
c  in CNF:
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_2
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨  b^{2, 283}_1
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ -p_564 ∨ -b^{2, 283}_0
c  in DIMACS:
 5492  5493 -5494 -564 -5495 0
 5492  5493 -5494 -564  5496 0
 5492  5493 -5494 -564 -5497 0

c  2+1 --> break 
c    (-b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧  p_564) -> break
c  in CNF:
c     b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 5492 -5493  5494 -564 1162 0


c  2-1 --> 1
c    (-b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧ -p_564) -> (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0)
c  in CNF:
c     b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_2
c     b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_1
c     b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨  b^{2, 283}_0
c  in DIMACS:
 5492 -5493  5494  564 -5495 0
 5492 -5493  5494  564 -5496 0
 5492 -5493  5494  564  5497 0

c  1-1 --> 0
c    (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0 ∧ -p_564) -> (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧ -b^{2, 283}_0)
c  in CNF:
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_2
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_1
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_0
c  in DIMACS:
 5492  5493 -5494  564 -5495 0
 5492  5493 -5494  564 -5496 0
 5492  5493 -5494  564 -5497 0

c  0-1 --> -1
c    (-b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧ -p_564) -> ( b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0)
c  in CNF:
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨  b^{2, 283}_2
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_1
c     b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨  b^{2, 283}_0
c  in DIMACS:
 5492  5493  5494  564  5495 0
 5492  5493  5494  564 -5496 0
 5492  5493  5494  564  5497 0

c  -1-1 --> -2
c    ( b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧  b^{2, 282}_0 ∧ -p_564) -> ( b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0)
c  in CNF:
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨  b^{2, 283}_2
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨  b^{2, 283}_1
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨  p_564 ∨ -b^{2, 283}_0
c  in DIMACS:
-5492  5493 -5494  564  5495 0
-5492  5493 -5494  564  5496 0
-5492  5493 -5494  564 -5497 0

c  -2-1 --> break 
c    ( b^{2, 282}_2 ∧  b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨  b^{2, 282}_0 ∨  p_564 ∨ break
c  in DIMACS:
-5492 -5493  5494  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 282}_2 ∧ -b^{2, 282}_1 ∧ -b^{2, 282}_0 ∧ true) 
c  in CNF:
c    -b^{2, 282}_2 ∨  b^{2, 282}_1 ∨  b^{2, 282}_0 ∨ false 
c  in DIMACS:
-5492  5493  5494  0

c  3 does not represent an automaton state.
c    -(-b^{2, 282}_2 ∧  b^{2, 282}_1 ∧  b^{2, 282}_0 ∧ true) 
c  in CNF:
c     b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ false 
c  in DIMACS:
 5492 -5493 -5494  0
c  -3 does not represent an automaton state.
c    -( b^{2, 282}_2 ∧  b^{2, 282}_1 ∧  b^{2, 282}_0 ∧ true) 
c  in CNF:
c    -b^{2, 282}_2 ∨ -b^{2, 282}_1 ∨ -b^{2, 282}_0 ∨ false 
c  in DIMACS:
-5492 -5493 -5494  0

c i = 283
c  -2+1 --> -1
c    ( b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧  p_566) -> ( b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0)
c  in CNF:
c    -b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨  b^{2, 284}_2
c    -b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_1
c    -b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨  b^{2, 284}_0
c  in DIMACS:
-5495 -5496  5497 -566  5498 0
-5495 -5496  5497 -566 -5499 0
-5495 -5496  5497 -566  5500 0

c  -1+1 --> 0
c    ( b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0 ∧  p_566) -> (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧ -b^{2, 284}_0)
c  in CNF:
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_2
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_1
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_0
c  in DIMACS:
-5495  5496 -5497 -566 -5498 0
-5495  5496 -5497 -566 -5499 0
-5495  5496 -5497 -566 -5500 0

c  0+1 --> 1
c    (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧  p_566) -> (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0)
c  in CNF:
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_2
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_1
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨  b^{2, 284}_0
c  in DIMACS:
 5495  5496  5497 -566 -5498 0
 5495  5496  5497 -566 -5499 0
 5495  5496  5497 -566  5500 0

c  1+1 --> 2
c    (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0 ∧  p_566) -> (-b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0)
c  in CNF:
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_2
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨  b^{2, 284}_1
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ -p_566 ∨ -b^{2, 284}_0
c  in DIMACS:
 5495  5496 -5497 -566 -5498 0
 5495  5496 -5497 -566  5499 0
 5495  5496 -5497 -566 -5500 0

c  2+1 --> break 
c    (-b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧  p_566) -> break
c  in CNF:
c     b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ -p_566 ∨ break
c  in DIMACS:
 5495 -5496  5497 -566 1162 0


c  2-1 --> 1
c    (-b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧ -p_566) -> (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0)
c  in CNF:
c     b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_2
c     b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_1
c     b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨  b^{2, 284}_0
c  in DIMACS:
 5495 -5496  5497  566 -5498 0
 5495 -5496  5497  566 -5499 0
 5495 -5496  5497  566  5500 0

c  1-1 --> 0
c    (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0 ∧ -p_566) -> (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧ -b^{2, 284}_0)
c  in CNF:
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_2
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_1
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_0
c  in DIMACS:
 5495  5496 -5497  566 -5498 0
 5495  5496 -5497  566 -5499 0
 5495  5496 -5497  566 -5500 0

c  0-1 --> -1
c    (-b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧ -p_566) -> ( b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0)
c  in CNF:
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨  b^{2, 284}_2
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_1
c     b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨  b^{2, 284}_0
c  in DIMACS:
 5495  5496  5497  566  5498 0
 5495  5496  5497  566 -5499 0
 5495  5496  5497  566  5500 0

c  -1-1 --> -2
c    ( b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧  b^{2, 283}_0 ∧ -p_566) -> ( b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0)
c  in CNF:
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨  b^{2, 284}_2
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨  b^{2, 284}_1
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨  p_566 ∨ -b^{2, 284}_0
c  in DIMACS:
-5495  5496 -5497  566  5498 0
-5495  5496 -5497  566  5499 0
-5495  5496 -5497  566 -5500 0

c  -2-1 --> break 
c    ( b^{2, 283}_2 ∧  b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧ -p_566) -> break
c  in CNF:
c    -b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨  b^{2, 283}_0 ∨  p_566 ∨ break
c  in DIMACS:
-5495 -5496  5497  566 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 283}_2 ∧ -b^{2, 283}_1 ∧ -b^{2, 283}_0 ∧ true) 
c  in CNF:
c    -b^{2, 283}_2 ∨  b^{2, 283}_1 ∨  b^{2, 283}_0 ∨ false 
c  in DIMACS:
-5495  5496  5497  0

c  3 does not represent an automaton state.
c    -(-b^{2, 283}_2 ∧  b^{2, 283}_1 ∧  b^{2, 283}_0 ∧ true) 
c  in CNF:
c     b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ false 
c  in DIMACS:
 5495 -5496 -5497  0
c  -3 does not represent an automaton state.
c    -( b^{2, 283}_2 ∧  b^{2, 283}_1 ∧  b^{2, 283}_0 ∧ true) 
c  in CNF:
c    -b^{2, 283}_2 ∨ -b^{2, 283}_1 ∨ -b^{2, 283}_0 ∨ false 
c  in DIMACS:
-5495 -5496 -5497  0

c i = 284
c  -2+1 --> -1
c    ( b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧  p_568) -> ( b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0)
c  in CNF:
c    -b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨  b^{2, 285}_2
c    -b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_1
c    -b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨  b^{2, 285}_0
c  in DIMACS:
-5498 -5499  5500 -568  5501 0
-5498 -5499  5500 -568 -5502 0
-5498 -5499  5500 -568  5503 0

c  -1+1 --> 0
c    ( b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0 ∧  p_568) -> (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧ -b^{2, 285}_0)
c  in CNF:
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_2
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_1
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_0
c  in DIMACS:
-5498  5499 -5500 -568 -5501 0
-5498  5499 -5500 -568 -5502 0
-5498  5499 -5500 -568 -5503 0

c  0+1 --> 1
c    (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧  p_568) -> (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0)
c  in CNF:
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_2
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_1
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨  b^{2, 285}_0
c  in DIMACS:
 5498  5499  5500 -568 -5501 0
 5498  5499  5500 -568 -5502 0
 5498  5499  5500 -568  5503 0

c  1+1 --> 2
c    (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0 ∧  p_568) -> (-b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0)
c  in CNF:
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_2
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨  b^{2, 285}_1
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ -p_568 ∨ -b^{2, 285}_0
c  in DIMACS:
 5498  5499 -5500 -568 -5501 0
 5498  5499 -5500 -568  5502 0
 5498  5499 -5500 -568 -5503 0

c  2+1 --> break 
c    (-b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧  p_568) -> break
c  in CNF:
c     b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 5498 -5499  5500 -568 1162 0


c  2-1 --> 1
c    (-b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧ -p_568) -> (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0)
c  in CNF:
c     b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_2
c     b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_1
c     b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨  b^{2, 285}_0
c  in DIMACS:
 5498 -5499  5500  568 -5501 0
 5498 -5499  5500  568 -5502 0
 5498 -5499  5500  568  5503 0

c  1-1 --> 0
c    (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0 ∧ -p_568) -> (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧ -b^{2, 285}_0)
c  in CNF:
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_2
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_1
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_0
c  in DIMACS:
 5498  5499 -5500  568 -5501 0
 5498  5499 -5500  568 -5502 0
 5498  5499 -5500  568 -5503 0

c  0-1 --> -1
c    (-b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧ -p_568) -> ( b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0)
c  in CNF:
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨  b^{2, 285}_2
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_1
c     b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨  b^{2, 285}_0
c  in DIMACS:
 5498  5499  5500  568  5501 0
 5498  5499  5500  568 -5502 0
 5498  5499  5500  568  5503 0

c  -1-1 --> -2
c    ( b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧  b^{2, 284}_0 ∧ -p_568) -> ( b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0)
c  in CNF:
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨  b^{2, 285}_2
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨  b^{2, 285}_1
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨  p_568 ∨ -b^{2, 285}_0
c  in DIMACS:
-5498  5499 -5500  568  5501 0
-5498  5499 -5500  568  5502 0
-5498  5499 -5500  568 -5503 0

c  -2-1 --> break 
c    ( b^{2, 284}_2 ∧  b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨  b^{2, 284}_0 ∨  p_568 ∨ break
c  in DIMACS:
-5498 -5499  5500  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 284}_2 ∧ -b^{2, 284}_1 ∧ -b^{2, 284}_0 ∧ true) 
c  in CNF:
c    -b^{2, 284}_2 ∨  b^{2, 284}_1 ∨  b^{2, 284}_0 ∨ false 
c  in DIMACS:
-5498  5499  5500  0

c  3 does not represent an automaton state.
c    -(-b^{2, 284}_2 ∧  b^{2, 284}_1 ∧  b^{2, 284}_0 ∧ true) 
c  in CNF:
c     b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ false 
c  in DIMACS:
 5498 -5499 -5500  0
c  -3 does not represent an automaton state.
c    -( b^{2, 284}_2 ∧  b^{2, 284}_1 ∧  b^{2, 284}_0 ∧ true) 
c  in CNF:
c    -b^{2, 284}_2 ∨ -b^{2, 284}_1 ∨ -b^{2, 284}_0 ∨ false 
c  in DIMACS:
-5498 -5499 -5500  0

c i = 285
c  -2+1 --> -1
c    ( b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧  p_570) -> ( b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0)
c  in CNF:
c    -b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨  b^{2, 286}_2
c    -b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_1
c    -b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨  b^{2, 286}_0
c  in DIMACS:
-5501 -5502  5503 -570  5504 0
-5501 -5502  5503 -570 -5505 0
-5501 -5502  5503 -570  5506 0

c  -1+1 --> 0
c    ( b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0 ∧  p_570) -> (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧ -b^{2, 286}_0)
c  in CNF:
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_2
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_1
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_0
c  in DIMACS:
-5501  5502 -5503 -570 -5504 0
-5501  5502 -5503 -570 -5505 0
-5501  5502 -5503 -570 -5506 0

c  0+1 --> 1
c    (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧  p_570) -> (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0)
c  in CNF:
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_2
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_1
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨  b^{2, 286}_0
c  in DIMACS:
 5501  5502  5503 -570 -5504 0
 5501  5502  5503 -570 -5505 0
 5501  5502  5503 -570  5506 0

c  1+1 --> 2
c    (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0 ∧  p_570) -> (-b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0)
c  in CNF:
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_2
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨  b^{2, 286}_1
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ -p_570 ∨ -b^{2, 286}_0
c  in DIMACS:
 5501  5502 -5503 -570 -5504 0
 5501  5502 -5503 -570  5505 0
 5501  5502 -5503 -570 -5506 0

c  2+1 --> break 
c    (-b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧  p_570) -> break
c  in CNF:
c     b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 5501 -5502  5503 -570 1162 0


c  2-1 --> 1
c    (-b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧ -p_570) -> (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0)
c  in CNF:
c     b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_2
c     b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_1
c     b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨  b^{2, 286}_0
c  in DIMACS:
 5501 -5502  5503  570 -5504 0
 5501 -5502  5503  570 -5505 0
 5501 -5502  5503  570  5506 0

c  1-1 --> 0
c    (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0 ∧ -p_570) -> (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧ -b^{2, 286}_0)
c  in CNF:
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_2
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_1
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_0
c  in DIMACS:
 5501  5502 -5503  570 -5504 0
 5501  5502 -5503  570 -5505 0
 5501  5502 -5503  570 -5506 0

c  0-1 --> -1
c    (-b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧ -p_570) -> ( b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0)
c  in CNF:
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨  b^{2, 286}_2
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_1
c     b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨  b^{2, 286}_0
c  in DIMACS:
 5501  5502  5503  570  5504 0
 5501  5502  5503  570 -5505 0
 5501  5502  5503  570  5506 0

c  -1-1 --> -2
c    ( b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧  b^{2, 285}_0 ∧ -p_570) -> ( b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0)
c  in CNF:
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨  b^{2, 286}_2
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨  b^{2, 286}_1
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨  p_570 ∨ -b^{2, 286}_0
c  in DIMACS:
-5501  5502 -5503  570  5504 0
-5501  5502 -5503  570  5505 0
-5501  5502 -5503  570 -5506 0

c  -2-1 --> break 
c    ( b^{2, 285}_2 ∧  b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨  b^{2, 285}_0 ∨  p_570 ∨ break
c  in DIMACS:
-5501 -5502  5503  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 285}_2 ∧ -b^{2, 285}_1 ∧ -b^{2, 285}_0 ∧ true) 
c  in CNF:
c    -b^{2, 285}_2 ∨  b^{2, 285}_1 ∨  b^{2, 285}_0 ∨ false 
c  in DIMACS:
-5501  5502  5503  0

c  3 does not represent an automaton state.
c    -(-b^{2, 285}_2 ∧  b^{2, 285}_1 ∧  b^{2, 285}_0 ∧ true) 
c  in CNF:
c     b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ false 
c  in DIMACS:
 5501 -5502 -5503  0
c  -3 does not represent an automaton state.
c    -( b^{2, 285}_2 ∧  b^{2, 285}_1 ∧  b^{2, 285}_0 ∧ true) 
c  in CNF:
c    -b^{2, 285}_2 ∨ -b^{2, 285}_1 ∨ -b^{2, 285}_0 ∨ false 
c  in DIMACS:
-5501 -5502 -5503  0

c i = 286
c  -2+1 --> -1
c    ( b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧  p_572) -> ( b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0)
c  in CNF:
c    -b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨  b^{2, 287}_2
c    -b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_1
c    -b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨  b^{2, 287}_0
c  in DIMACS:
-5504 -5505  5506 -572  5507 0
-5504 -5505  5506 -572 -5508 0
-5504 -5505  5506 -572  5509 0

c  -1+1 --> 0
c    ( b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0 ∧  p_572) -> (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧ -b^{2, 287}_0)
c  in CNF:
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_2
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_1
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_0
c  in DIMACS:
-5504  5505 -5506 -572 -5507 0
-5504  5505 -5506 -572 -5508 0
-5504  5505 -5506 -572 -5509 0

c  0+1 --> 1
c    (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧  p_572) -> (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0)
c  in CNF:
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_2
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_1
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨  b^{2, 287}_0
c  in DIMACS:
 5504  5505  5506 -572 -5507 0
 5504  5505  5506 -572 -5508 0
 5504  5505  5506 -572  5509 0

c  1+1 --> 2
c    (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0 ∧  p_572) -> (-b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0)
c  in CNF:
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_2
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨  b^{2, 287}_1
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ -p_572 ∨ -b^{2, 287}_0
c  in DIMACS:
 5504  5505 -5506 -572 -5507 0
 5504  5505 -5506 -572  5508 0
 5504  5505 -5506 -572 -5509 0

c  2+1 --> break 
c    (-b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧  p_572) -> break
c  in CNF:
c     b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 5504 -5505  5506 -572 1162 0


c  2-1 --> 1
c    (-b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧ -p_572) -> (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0)
c  in CNF:
c     b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_2
c     b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_1
c     b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨  b^{2, 287}_0
c  in DIMACS:
 5504 -5505  5506  572 -5507 0
 5504 -5505  5506  572 -5508 0
 5504 -5505  5506  572  5509 0

c  1-1 --> 0
c    (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0 ∧ -p_572) -> (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧ -b^{2, 287}_0)
c  in CNF:
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_2
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_1
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_0
c  in DIMACS:
 5504  5505 -5506  572 -5507 0
 5504  5505 -5506  572 -5508 0
 5504  5505 -5506  572 -5509 0

c  0-1 --> -1
c    (-b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧ -p_572) -> ( b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0)
c  in CNF:
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨  b^{2, 287}_2
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_1
c     b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨  b^{2, 287}_0
c  in DIMACS:
 5504  5505  5506  572  5507 0
 5504  5505  5506  572 -5508 0
 5504  5505  5506  572  5509 0

c  -1-1 --> -2
c    ( b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧  b^{2, 286}_0 ∧ -p_572) -> ( b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0)
c  in CNF:
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨  b^{2, 287}_2
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨  b^{2, 287}_1
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨  p_572 ∨ -b^{2, 287}_0
c  in DIMACS:
-5504  5505 -5506  572  5507 0
-5504  5505 -5506  572  5508 0
-5504  5505 -5506  572 -5509 0

c  -2-1 --> break 
c    ( b^{2, 286}_2 ∧  b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨  b^{2, 286}_0 ∨  p_572 ∨ break
c  in DIMACS:
-5504 -5505  5506  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 286}_2 ∧ -b^{2, 286}_1 ∧ -b^{2, 286}_0 ∧ true) 
c  in CNF:
c    -b^{2, 286}_2 ∨  b^{2, 286}_1 ∨  b^{2, 286}_0 ∨ false 
c  in DIMACS:
-5504  5505  5506  0

c  3 does not represent an automaton state.
c    -(-b^{2, 286}_2 ∧  b^{2, 286}_1 ∧  b^{2, 286}_0 ∧ true) 
c  in CNF:
c     b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ false 
c  in DIMACS:
 5504 -5505 -5506  0
c  -3 does not represent an automaton state.
c    -( b^{2, 286}_2 ∧  b^{2, 286}_1 ∧  b^{2, 286}_0 ∧ true) 
c  in CNF:
c    -b^{2, 286}_2 ∨ -b^{2, 286}_1 ∨ -b^{2, 286}_0 ∨ false 
c  in DIMACS:
-5504 -5505 -5506  0

c i = 287
c  -2+1 --> -1
c    ( b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧  p_574) -> ( b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0)
c  in CNF:
c    -b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨  b^{2, 288}_2
c    -b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_1
c    -b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨  b^{2, 288}_0
c  in DIMACS:
-5507 -5508  5509 -574  5510 0
-5507 -5508  5509 -574 -5511 0
-5507 -5508  5509 -574  5512 0

c  -1+1 --> 0
c    ( b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0 ∧  p_574) -> (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧ -b^{2, 288}_0)
c  in CNF:
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_2
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_1
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_0
c  in DIMACS:
-5507  5508 -5509 -574 -5510 0
-5507  5508 -5509 -574 -5511 0
-5507  5508 -5509 -574 -5512 0

c  0+1 --> 1
c    (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧  p_574) -> (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0)
c  in CNF:
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_2
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_1
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨  b^{2, 288}_0
c  in DIMACS:
 5507  5508  5509 -574 -5510 0
 5507  5508  5509 -574 -5511 0
 5507  5508  5509 -574  5512 0

c  1+1 --> 2
c    (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0 ∧  p_574) -> (-b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0)
c  in CNF:
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_2
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨  b^{2, 288}_1
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ -p_574 ∨ -b^{2, 288}_0
c  in DIMACS:
 5507  5508 -5509 -574 -5510 0
 5507  5508 -5509 -574  5511 0
 5507  5508 -5509 -574 -5512 0

c  2+1 --> break 
c    (-b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧  p_574) -> break
c  in CNF:
c     b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 5507 -5508  5509 -574 1162 0


c  2-1 --> 1
c    (-b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧ -p_574) -> (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0)
c  in CNF:
c     b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_2
c     b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_1
c     b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨  b^{2, 288}_0
c  in DIMACS:
 5507 -5508  5509  574 -5510 0
 5507 -5508  5509  574 -5511 0
 5507 -5508  5509  574  5512 0

c  1-1 --> 0
c    (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0 ∧ -p_574) -> (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧ -b^{2, 288}_0)
c  in CNF:
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_2
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_1
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_0
c  in DIMACS:
 5507  5508 -5509  574 -5510 0
 5507  5508 -5509  574 -5511 0
 5507  5508 -5509  574 -5512 0

c  0-1 --> -1
c    (-b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧ -p_574) -> ( b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0)
c  in CNF:
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨  b^{2, 288}_2
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_1
c     b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨  b^{2, 288}_0
c  in DIMACS:
 5507  5508  5509  574  5510 0
 5507  5508  5509  574 -5511 0
 5507  5508  5509  574  5512 0

c  -1-1 --> -2
c    ( b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧  b^{2, 287}_0 ∧ -p_574) -> ( b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0)
c  in CNF:
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨  b^{2, 288}_2
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨  b^{2, 288}_1
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨  p_574 ∨ -b^{2, 288}_0
c  in DIMACS:
-5507  5508 -5509  574  5510 0
-5507  5508 -5509  574  5511 0
-5507  5508 -5509  574 -5512 0

c  -2-1 --> break 
c    ( b^{2, 287}_2 ∧  b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨  b^{2, 287}_0 ∨  p_574 ∨ break
c  in DIMACS:
-5507 -5508  5509  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 287}_2 ∧ -b^{2, 287}_1 ∧ -b^{2, 287}_0 ∧ true) 
c  in CNF:
c    -b^{2, 287}_2 ∨  b^{2, 287}_1 ∨  b^{2, 287}_0 ∨ false 
c  in DIMACS:
-5507  5508  5509  0

c  3 does not represent an automaton state.
c    -(-b^{2, 287}_2 ∧  b^{2, 287}_1 ∧  b^{2, 287}_0 ∧ true) 
c  in CNF:
c     b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ false 
c  in DIMACS:
 5507 -5508 -5509  0
c  -3 does not represent an automaton state.
c    -( b^{2, 287}_2 ∧  b^{2, 287}_1 ∧  b^{2, 287}_0 ∧ true) 
c  in CNF:
c    -b^{2, 287}_2 ∨ -b^{2, 287}_1 ∨ -b^{2, 287}_0 ∨ false 
c  in DIMACS:
-5507 -5508 -5509  0

c i = 288
c  -2+1 --> -1
c    ( b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧  p_576) -> ( b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0)
c  in CNF:
c    -b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨  b^{2, 289}_2
c    -b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_1
c    -b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨  b^{2, 289}_0
c  in DIMACS:
-5510 -5511  5512 -576  5513 0
-5510 -5511  5512 -576 -5514 0
-5510 -5511  5512 -576  5515 0

c  -1+1 --> 0
c    ( b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0 ∧  p_576) -> (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧ -b^{2, 289}_0)
c  in CNF:
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_2
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_1
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_0
c  in DIMACS:
-5510  5511 -5512 -576 -5513 0
-5510  5511 -5512 -576 -5514 0
-5510  5511 -5512 -576 -5515 0

c  0+1 --> 1
c    (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧  p_576) -> (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0)
c  in CNF:
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_2
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_1
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨  b^{2, 289}_0
c  in DIMACS:
 5510  5511  5512 -576 -5513 0
 5510  5511  5512 -576 -5514 0
 5510  5511  5512 -576  5515 0

c  1+1 --> 2
c    (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0 ∧  p_576) -> (-b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0)
c  in CNF:
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_2
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨  b^{2, 289}_1
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ -p_576 ∨ -b^{2, 289}_0
c  in DIMACS:
 5510  5511 -5512 -576 -5513 0
 5510  5511 -5512 -576  5514 0
 5510  5511 -5512 -576 -5515 0

c  2+1 --> break 
c    (-b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧  p_576) -> break
c  in CNF:
c     b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 5510 -5511  5512 -576 1162 0


c  2-1 --> 1
c    (-b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧ -p_576) -> (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0)
c  in CNF:
c     b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_2
c     b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_1
c     b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨  b^{2, 289}_0
c  in DIMACS:
 5510 -5511  5512  576 -5513 0
 5510 -5511  5512  576 -5514 0
 5510 -5511  5512  576  5515 0

c  1-1 --> 0
c    (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0 ∧ -p_576) -> (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧ -b^{2, 289}_0)
c  in CNF:
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_2
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_1
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_0
c  in DIMACS:
 5510  5511 -5512  576 -5513 0
 5510  5511 -5512  576 -5514 0
 5510  5511 -5512  576 -5515 0

c  0-1 --> -1
c    (-b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧ -p_576) -> ( b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0)
c  in CNF:
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨  b^{2, 289}_2
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_1
c     b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨  b^{2, 289}_0
c  in DIMACS:
 5510  5511  5512  576  5513 0
 5510  5511  5512  576 -5514 0
 5510  5511  5512  576  5515 0

c  -1-1 --> -2
c    ( b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧  b^{2, 288}_0 ∧ -p_576) -> ( b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0)
c  in CNF:
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨  b^{2, 289}_2
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨  b^{2, 289}_1
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨  p_576 ∨ -b^{2, 289}_0
c  in DIMACS:
-5510  5511 -5512  576  5513 0
-5510  5511 -5512  576  5514 0
-5510  5511 -5512  576 -5515 0

c  -2-1 --> break 
c    ( b^{2, 288}_2 ∧  b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨  b^{2, 288}_0 ∨  p_576 ∨ break
c  in DIMACS:
-5510 -5511  5512  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 288}_2 ∧ -b^{2, 288}_1 ∧ -b^{2, 288}_0 ∧ true) 
c  in CNF:
c    -b^{2, 288}_2 ∨  b^{2, 288}_1 ∨  b^{2, 288}_0 ∨ false 
c  in DIMACS:
-5510  5511  5512  0

c  3 does not represent an automaton state.
c    -(-b^{2, 288}_2 ∧  b^{2, 288}_1 ∧  b^{2, 288}_0 ∧ true) 
c  in CNF:
c     b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ false 
c  in DIMACS:
 5510 -5511 -5512  0
c  -3 does not represent an automaton state.
c    -( b^{2, 288}_2 ∧  b^{2, 288}_1 ∧  b^{2, 288}_0 ∧ true) 
c  in CNF:
c    -b^{2, 288}_2 ∨ -b^{2, 288}_1 ∨ -b^{2, 288}_0 ∨ false 
c  in DIMACS:
-5510 -5511 -5512  0

c i = 289
c  -2+1 --> -1
c    ( b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧  p_578) -> ( b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0)
c  in CNF:
c    -b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨  b^{2, 290}_2
c    -b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_1
c    -b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨  b^{2, 290}_0
c  in DIMACS:
-5513 -5514  5515 -578  5516 0
-5513 -5514  5515 -578 -5517 0
-5513 -5514  5515 -578  5518 0

c  -1+1 --> 0
c    ( b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0 ∧  p_578) -> (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧ -b^{2, 290}_0)
c  in CNF:
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_2
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_1
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_0
c  in DIMACS:
-5513  5514 -5515 -578 -5516 0
-5513  5514 -5515 -578 -5517 0
-5513  5514 -5515 -578 -5518 0

c  0+1 --> 1
c    (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧  p_578) -> (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0)
c  in CNF:
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_2
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_1
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨  b^{2, 290}_0
c  in DIMACS:
 5513  5514  5515 -578 -5516 0
 5513  5514  5515 -578 -5517 0
 5513  5514  5515 -578  5518 0

c  1+1 --> 2
c    (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0 ∧  p_578) -> (-b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0)
c  in CNF:
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_2
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨  b^{2, 290}_1
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ -p_578 ∨ -b^{2, 290}_0
c  in DIMACS:
 5513  5514 -5515 -578 -5516 0
 5513  5514 -5515 -578  5517 0
 5513  5514 -5515 -578 -5518 0

c  2+1 --> break 
c    (-b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧  p_578) -> break
c  in CNF:
c     b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ -p_578 ∨ break
c  in DIMACS:
 5513 -5514  5515 -578 1162 0


c  2-1 --> 1
c    (-b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧ -p_578) -> (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0)
c  in CNF:
c     b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_2
c     b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_1
c     b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨  b^{2, 290}_0
c  in DIMACS:
 5513 -5514  5515  578 -5516 0
 5513 -5514  5515  578 -5517 0
 5513 -5514  5515  578  5518 0

c  1-1 --> 0
c    (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0 ∧ -p_578) -> (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧ -b^{2, 290}_0)
c  in CNF:
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_2
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_1
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_0
c  in DIMACS:
 5513  5514 -5515  578 -5516 0
 5513  5514 -5515  578 -5517 0
 5513  5514 -5515  578 -5518 0

c  0-1 --> -1
c    (-b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧ -p_578) -> ( b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0)
c  in CNF:
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨  b^{2, 290}_2
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_1
c     b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨  b^{2, 290}_0
c  in DIMACS:
 5513  5514  5515  578  5516 0
 5513  5514  5515  578 -5517 0
 5513  5514  5515  578  5518 0

c  -1-1 --> -2
c    ( b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧  b^{2, 289}_0 ∧ -p_578) -> ( b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0)
c  in CNF:
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨  b^{2, 290}_2
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨  b^{2, 290}_1
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨  p_578 ∨ -b^{2, 290}_0
c  in DIMACS:
-5513  5514 -5515  578  5516 0
-5513  5514 -5515  578  5517 0
-5513  5514 -5515  578 -5518 0

c  -2-1 --> break 
c    ( b^{2, 289}_2 ∧  b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧ -p_578) -> break
c  in CNF:
c    -b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨  b^{2, 289}_0 ∨  p_578 ∨ break
c  in DIMACS:
-5513 -5514  5515  578 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 289}_2 ∧ -b^{2, 289}_1 ∧ -b^{2, 289}_0 ∧ true) 
c  in CNF:
c    -b^{2, 289}_2 ∨  b^{2, 289}_1 ∨  b^{2, 289}_0 ∨ false 
c  in DIMACS:
-5513  5514  5515  0

c  3 does not represent an automaton state.
c    -(-b^{2, 289}_2 ∧  b^{2, 289}_1 ∧  b^{2, 289}_0 ∧ true) 
c  in CNF:
c     b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ false 
c  in DIMACS:
 5513 -5514 -5515  0
c  -3 does not represent an automaton state.
c    -( b^{2, 289}_2 ∧  b^{2, 289}_1 ∧  b^{2, 289}_0 ∧ true) 
c  in CNF:
c    -b^{2, 289}_2 ∨ -b^{2, 289}_1 ∨ -b^{2, 289}_0 ∨ false 
c  in DIMACS:
-5513 -5514 -5515  0

c i = 290
c  -2+1 --> -1
c    ( b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧  p_580) -> ( b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0)
c  in CNF:
c    -b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨  b^{2, 291}_2
c    -b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_1
c    -b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨  b^{2, 291}_0
c  in DIMACS:
-5516 -5517  5518 -580  5519 0
-5516 -5517  5518 -580 -5520 0
-5516 -5517  5518 -580  5521 0

c  -1+1 --> 0
c    ( b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0 ∧  p_580) -> (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧ -b^{2, 291}_0)
c  in CNF:
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_2
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_1
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_0
c  in DIMACS:
-5516  5517 -5518 -580 -5519 0
-5516  5517 -5518 -580 -5520 0
-5516  5517 -5518 -580 -5521 0

c  0+1 --> 1
c    (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧  p_580) -> (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0)
c  in CNF:
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_2
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_1
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨  b^{2, 291}_0
c  in DIMACS:
 5516  5517  5518 -580 -5519 0
 5516  5517  5518 -580 -5520 0
 5516  5517  5518 -580  5521 0

c  1+1 --> 2
c    (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0 ∧  p_580) -> (-b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0)
c  in CNF:
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_2
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨  b^{2, 291}_1
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ -p_580 ∨ -b^{2, 291}_0
c  in DIMACS:
 5516  5517 -5518 -580 -5519 0
 5516  5517 -5518 -580  5520 0
 5516  5517 -5518 -580 -5521 0

c  2+1 --> break 
c    (-b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧  p_580) -> break
c  in CNF:
c     b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 5516 -5517  5518 -580 1162 0


c  2-1 --> 1
c    (-b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧ -p_580) -> (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0)
c  in CNF:
c     b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_2
c     b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_1
c     b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨  b^{2, 291}_0
c  in DIMACS:
 5516 -5517  5518  580 -5519 0
 5516 -5517  5518  580 -5520 0
 5516 -5517  5518  580  5521 0

c  1-1 --> 0
c    (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0 ∧ -p_580) -> (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧ -b^{2, 291}_0)
c  in CNF:
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_2
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_1
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_0
c  in DIMACS:
 5516  5517 -5518  580 -5519 0
 5516  5517 -5518  580 -5520 0
 5516  5517 -5518  580 -5521 0

c  0-1 --> -1
c    (-b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧ -p_580) -> ( b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0)
c  in CNF:
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨  b^{2, 291}_2
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_1
c     b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨  b^{2, 291}_0
c  in DIMACS:
 5516  5517  5518  580  5519 0
 5516  5517  5518  580 -5520 0
 5516  5517  5518  580  5521 0

c  -1-1 --> -2
c    ( b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧  b^{2, 290}_0 ∧ -p_580) -> ( b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0)
c  in CNF:
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨  b^{2, 291}_2
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨  b^{2, 291}_1
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨  p_580 ∨ -b^{2, 291}_0
c  in DIMACS:
-5516  5517 -5518  580  5519 0
-5516  5517 -5518  580  5520 0
-5516  5517 -5518  580 -5521 0

c  -2-1 --> break 
c    ( b^{2, 290}_2 ∧  b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨  b^{2, 290}_0 ∨  p_580 ∨ break
c  in DIMACS:
-5516 -5517  5518  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 290}_2 ∧ -b^{2, 290}_1 ∧ -b^{2, 290}_0 ∧ true) 
c  in CNF:
c    -b^{2, 290}_2 ∨  b^{2, 290}_1 ∨  b^{2, 290}_0 ∨ false 
c  in DIMACS:
-5516  5517  5518  0

c  3 does not represent an automaton state.
c    -(-b^{2, 290}_2 ∧  b^{2, 290}_1 ∧  b^{2, 290}_0 ∧ true) 
c  in CNF:
c     b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ false 
c  in DIMACS:
 5516 -5517 -5518  0
c  -3 does not represent an automaton state.
c    -( b^{2, 290}_2 ∧  b^{2, 290}_1 ∧  b^{2, 290}_0 ∧ true) 
c  in CNF:
c    -b^{2, 290}_2 ∨ -b^{2, 290}_1 ∨ -b^{2, 290}_0 ∨ false 
c  in DIMACS:
-5516 -5517 -5518  0

c i = 291
c  -2+1 --> -1
c    ( b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧  p_582) -> ( b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0)
c  in CNF:
c    -b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨  b^{2, 292}_2
c    -b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_1
c    -b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨  b^{2, 292}_0
c  in DIMACS:
-5519 -5520  5521 -582  5522 0
-5519 -5520  5521 -582 -5523 0
-5519 -5520  5521 -582  5524 0

c  -1+1 --> 0
c    ( b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0 ∧  p_582) -> (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧ -b^{2, 292}_0)
c  in CNF:
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_2
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_1
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_0
c  in DIMACS:
-5519  5520 -5521 -582 -5522 0
-5519  5520 -5521 -582 -5523 0
-5519  5520 -5521 -582 -5524 0

c  0+1 --> 1
c    (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧  p_582) -> (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0)
c  in CNF:
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_2
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_1
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨  b^{2, 292}_0
c  in DIMACS:
 5519  5520  5521 -582 -5522 0
 5519  5520  5521 -582 -5523 0
 5519  5520  5521 -582  5524 0

c  1+1 --> 2
c    (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0 ∧  p_582) -> (-b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0)
c  in CNF:
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_2
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨  b^{2, 292}_1
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ -p_582 ∨ -b^{2, 292}_0
c  in DIMACS:
 5519  5520 -5521 -582 -5522 0
 5519  5520 -5521 -582  5523 0
 5519  5520 -5521 -582 -5524 0

c  2+1 --> break 
c    (-b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧  p_582) -> break
c  in CNF:
c     b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 5519 -5520  5521 -582 1162 0


c  2-1 --> 1
c    (-b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧ -p_582) -> (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0)
c  in CNF:
c     b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_2
c     b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_1
c     b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨  b^{2, 292}_0
c  in DIMACS:
 5519 -5520  5521  582 -5522 0
 5519 -5520  5521  582 -5523 0
 5519 -5520  5521  582  5524 0

c  1-1 --> 0
c    (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0 ∧ -p_582) -> (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧ -b^{2, 292}_0)
c  in CNF:
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_2
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_1
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_0
c  in DIMACS:
 5519  5520 -5521  582 -5522 0
 5519  5520 -5521  582 -5523 0
 5519  5520 -5521  582 -5524 0

c  0-1 --> -1
c    (-b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧ -p_582) -> ( b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0)
c  in CNF:
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨  b^{2, 292}_2
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_1
c     b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨  b^{2, 292}_0
c  in DIMACS:
 5519  5520  5521  582  5522 0
 5519  5520  5521  582 -5523 0
 5519  5520  5521  582  5524 0

c  -1-1 --> -2
c    ( b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧  b^{2, 291}_0 ∧ -p_582) -> ( b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0)
c  in CNF:
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨  b^{2, 292}_2
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨  b^{2, 292}_1
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨  p_582 ∨ -b^{2, 292}_0
c  in DIMACS:
-5519  5520 -5521  582  5522 0
-5519  5520 -5521  582  5523 0
-5519  5520 -5521  582 -5524 0

c  -2-1 --> break 
c    ( b^{2, 291}_2 ∧  b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨  b^{2, 291}_0 ∨  p_582 ∨ break
c  in DIMACS:
-5519 -5520  5521  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 291}_2 ∧ -b^{2, 291}_1 ∧ -b^{2, 291}_0 ∧ true) 
c  in CNF:
c    -b^{2, 291}_2 ∨  b^{2, 291}_1 ∨  b^{2, 291}_0 ∨ false 
c  in DIMACS:
-5519  5520  5521  0

c  3 does not represent an automaton state.
c    -(-b^{2, 291}_2 ∧  b^{2, 291}_1 ∧  b^{2, 291}_0 ∧ true) 
c  in CNF:
c     b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ false 
c  in DIMACS:
 5519 -5520 -5521  0
c  -3 does not represent an automaton state.
c    -( b^{2, 291}_2 ∧  b^{2, 291}_1 ∧  b^{2, 291}_0 ∧ true) 
c  in CNF:
c    -b^{2, 291}_2 ∨ -b^{2, 291}_1 ∨ -b^{2, 291}_0 ∨ false 
c  in DIMACS:
-5519 -5520 -5521  0

c i = 292
c  -2+1 --> -1
c    ( b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧  p_584) -> ( b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0)
c  in CNF:
c    -b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨  b^{2, 293}_2
c    -b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_1
c    -b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨  b^{2, 293}_0
c  in DIMACS:
-5522 -5523  5524 -584  5525 0
-5522 -5523  5524 -584 -5526 0
-5522 -5523  5524 -584  5527 0

c  -1+1 --> 0
c    ( b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0 ∧  p_584) -> (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧ -b^{2, 293}_0)
c  in CNF:
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_2
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_1
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_0
c  in DIMACS:
-5522  5523 -5524 -584 -5525 0
-5522  5523 -5524 -584 -5526 0
-5522  5523 -5524 -584 -5527 0

c  0+1 --> 1
c    (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧  p_584) -> (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0)
c  in CNF:
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_2
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_1
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨  b^{2, 293}_0
c  in DIMACS:
 5522  5523  5524 -584 -5525 0
 5522  5523  5524 -584 -5526 0
 5522  5523  5524 -584  5527 0

c  1+1 --> 2
c    (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0 ∧  p_584) -> (-b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0)
c  in CNF:
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_2
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨  b^{2, 293}_1
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ -p_584 ∨ -b^{2, 293}_0
c  in DIMACS:
 5522  5523 -5524 -584 -5525 0
 5522  5523 -5524 -584  5526 0
 5522  5523 -5524 -584 -5527 0

c  2+1 --> break 
c    (-b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧  p_584) -> break
c  in CNF:
c     b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 5522 -5523  5524 -584 1162 0


c  2-1 --> 1
c    (-b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧ -p_584) -> (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0)
c  in CNF:
c     b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_2
c     b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_1
c     b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨  b^{2, 293}_0
c  in DIMACS:
 5522 -5523  5524  584 -5525 0
 5522 -5523  5524  584 -5526 0
 5522 -5523  5524  584  5527 0

c  1-1 --> 0
c    (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0 ∧ -p_584) -> (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧ -b^{2, 293}_0)
c  in CNF:
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_2
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_1
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_0
c  in DIMACS:
 5522  5523 -5524  584 -5525 0
 5522  5523 -5524  584 -5526 0
 5522  5523 -5524  584 -5527 0

c  0-1 --> -1
c    (-b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧ -p_584) -> ( b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0)
c  in CNF:
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨  b^{2, 293}_2
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_1
c     b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨  b^{2, 293}_0
c  in DIMACS:
 5522  5523  5524  584  5525 0
 5522  5523  5524  584 -5526 0
 5522  5523  5524  584  5527 0

c  -1-1 --> -2
c    ( b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧  b^{2, 292}_0 ∧ -p_584) -> ( b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0)
c  in CNF:
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨  b^{2, 293}_2
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨  b^{2, 293}_1
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨  p_584 ∨ -b^{2, 293}_0
c  in DIMACS:
-5522  5523 -5524  584  5525 0
-5522  5523 -5524  584  5526 0
-5522  5523 -5524  584 -5527 0

c  -2-1 --> break 
c    ( b^{2, 292}_2 ∧  b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨  b^{2, 292}_0 ∨  p_584 ∨ break
c  in DIMACS:
-5522 -5523  5524  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 292}_2 ∧ -b^{2, 292}_1 ∧ -b^{2, 292}_0 ∧ true) 
c  in CNF:
c    -b^{2, 292}_2 ∨  b^{2, 292}_1 ∨  b^{2, 292}_0 ∨ false 
c  in DIMACS:
-5522  5523  5524  0

c  3 does not represent an automaton state.
c    -(-b^{2, 292}_2 ∧  b^{2, 292}_1 ∧  b^{2, 292}_0 ∧ true) 
c  in CNF:
c     b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ false 
c  in DIMACS:
 5522 -5523 -5524  0
c  -3 does not represent an automaton state.
c    -( b^{2, 292}_2 ∧  b^{2, 292}_1 ∧  b^{2, 292}_0 ∧ true) 
c  in CNF:
c    -b^{2, 292}_2 ∨ -b^{2, 292}_1 ∨ -b^{2, 292}_0 ∨ false 
c  in DIMACS:
-5522 -5523 -5524  0

c i = 293
c  -2+1 --> -1
c    ( b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧  p_586) -> ( b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0)
c  in CNF:
c    -b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨  b^{2, 294}_2
c    -b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_1
c    -b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨  b^{2, 294}_0
c  in DIMACS:
-5525 -5526  5527 -586  5528 0
-5525 -5526  5527 -586 -5529 0
-5525 -5526  5527 -586  5530 0

c  -1+1 --> 0
c    ( b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0 ∧  p_586) -> (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧ -b^{2, 294}_0)
c  in CNF:
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_2
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_1
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_0
c  in DIMACS:
-5525  5526 -5527 -586 -5528 0
-5525  5526 -5527 -586 -5529 0
-5525  5526 -5527 -586 -5530 0

c  0+1 --> 1
c    (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧  p_586) -> (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0)
c  in CNF:
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_2
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_1
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨  b^{2, 294}_0
c  in DIMACS:
 5525  5526  5527 -586 -5528 0
 5525  5526  5527 -586 -5529 0
 5525  5526  5527 -586  5530 0

c  1+1 --> 2
c    (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0 ∧  p_586) -> (-b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0)
c  in CNF:
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_2
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨  b^{2, 294}_1
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ -p_586 ∨ -b^{2, 294}_0
c  in DIMACS:
 5525  5526 -5527 -586 -5528 0
 5525  5526 -5527 -586  5529 0
 5525  5526 -5527 -586 -5530 0

c  2+1 --> break 
c    (-b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧  p_586) -> break
c  in CNF:
c     b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ -p_586 ∨ break
c  in DIMACS:
 5525 -5526  5527 -586 1162 0


c  2-1 --> 1
c    (-b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧ -p_586) -> (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0)
c  in CNF:
c     b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_2
c     b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_1
c     b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨  b^{2, 294}_0
c  in DIMACS:
 5525 -5526  5527  586 -5528 0
 5525 -5526  5527  586 -5529 0
 5525 -5526  5527  586  5530 0

c  1-1 --> 0
c    (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0 ∧ -p_586) -> (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧ -b^{2, 294}_0)
c  in CNF:
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_2
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_1
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_0
c  in DIMACS:
 5525  5526 -5527  586 -5528 0
 5525  5526 -5527  586 -5529 0
 5525  5526 -5527  586 -5530 0

c  0-1 --> -1
c    (-b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧ -p_586) -> ( b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0)
c  in CNF:
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨  b^{2, 294}_2
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_1
c     b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨  b^{2, 294}_0
c  in DIMACS:
 5525  5526  5527  586  5528 0
 5525  5526  5527  586 -5529 0
 5525  5526  5527  586  5530 0

c  -1-1 --> -2
c    ( b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧  b^{2, 293}_0 ∧ -p_586) -> ( b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0)
c  in CNF:
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨  b^{2, 294}_2
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨  b^{2, 294}_1
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨  p_586 ∨ -b^{2, 294}_0
c  in DIMACS:
-5525  5526 -5527  586  5528 0
-5525  5526 -5527  586  5529 0
-5525  5526 -5527  586 -5530 0

c  -2-1 --> break 
c    ( b^{2, 293}_2 ∧  b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧ -p_586) -> break
c  in CNF:
c    -b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨  b^{2, 293}_0 ∨  p_586 ∨ break
c  in DIMACS:
-5525 -5526  5527  586 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 293}_2 ∧ -b^{2, 293}_1 ∧ -b^{2, 293}_0 ∧ true) 
c  in CNF:
c    -b^{2, 293}_2 ∨  b^{2, 293}_1 ∨  b^{2, 293}_0 ∨ false 
c  in DIMACS:
-5525  5526  5527  0

c  3 does not represent an automaton state.
c    -(-b^{2, 293}_2 ∧  b^{2, 293}_1 ∧  b^{2, 293}_0 ∧ true) 
c  in CNF:
c     b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ false 
c  in DIMACS:
 5525 -5526 -5527  0
c  -3 does not represent an automaton state.
c    -( b^{2, 293}_2 ∧  b^{2, 293}_1 ∧  b^{2, 293}_0 ∧ true) 
c  in CNF:
c    -b^{2, 293}_2 ∨ -b^{2, 293}_1 ∨ -b^{2, 293}_0 ∨ false 
c  in DIMACS:
-5525 -5526 -5527  0

c i = 294
c  -2+1 --> -1
c    ( b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧  p_588) -> ( b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0)
c  in CNF:
c    -b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨  b^{2, 295}_2
c    -b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_1
c    -b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨  b^{2, 295}_0
c  in DIMACS:
-5528 -5529  5530 -588  5531 0
-5528 -5529  5530 -588 -5532 0
-5528 -5529  5530 -588  5533 0

c  -1+1 --> 0
c    ( b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0 ∧  p_588) -> (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧ -b^{2, 295}_0)
c  in CNF:
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_2
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_1
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_0
c  in DIMACS:
-5528  5529 -5530 -588 -5531 0
-5528  5529 -5530 -588 -5532 0
-5528  5529 -5530 -588 -5533 0

c  0+1 --> 1
c    (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧  p_588) -> (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0)
c  in CNF:
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_2
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_1
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨  b^{2, 295}_0
c  in DIMACS:
 5528  5529  5530 -588 -5531 0
 5528  5529  5530 -588 -5532 0
 5528  5529  5530 -588  5533 0

c  1+1 --> 2
c    (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0 ∧  p_588) -> (-b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0)
c  in CNF:
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_2
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨  b^{2, 295}_1
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ -p_588 ∨ -b^{2, 295}_0
c  in DIMACS:
 5528  5529 -5530 -588 -5531 0
 5528  5529 -5530 -588  5532 0
 5528  5529 -5530 -588 -5533 0

c  2+1 --> break 
c    (-b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧  p_588) -> break
c  in CNF:
c     b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 5528 -5529  5530 -588 1162 0


c  2-1 --> 1
c    (-b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧ -p_588) -> (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0)
c  in CNF:
c     b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_2
c     b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_1
c     b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨  b^{2, 295}_0
c  in DIMACS:
 5528 -5529  5530  588 -5531 0
 5528 -5529  5530  588 -5532 0
 5528 -5529  5530  588  5533 0

c  1-1 --> 0
c    (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0 ∧ -p_588) -> (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧ -b^{2, 295}_0)
c  in CNF:
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_2
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_1
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_0
c  in DIMACS:
 5528  5529 -5530  588 -5531 0
 5528  5529 -5530  588 -5532 0
 5528  5529 -5530  588 -5533 0

c  0-1 --> -1
c    (-b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧ -p_588) -> ( b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0)
c  in CNF:
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨  b^{2, 295}_2
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_1
c     b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨  b^{2, 295}_0
c  in DIMACS:
 5528  5529  5530  588  5531 0
 5528  5529  5530  588 -5532 0
 5528  5529  5530  588  5533 0

c  -1-1 --> -2
c    ( b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧  b^{2, 294}_0 ∧ -p_588) -> ( b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0)
c  in CNF:
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨  b^{2, 295}_2
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨  b^{2, 295}_1
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨  p_588 ∨ -b^{2, 295}_0
c  in DIMACS:
-5528  5529 -5530  588  5531 0
-5528  5529 -5530  588  5532 0
-5528  5529 -5530  588 -5533 0

c  -2-1 --> break 
c    ( b^{2, 294}_2 ∧  b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨  b^{2, 294}_0 ∨  p_588 ∨ break
c  in DIMACS:
-5528 -5529  5530  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 294}_2 ∧ -b^{2, 294}_1 ∧ -b^{2, 294}_0 ∧ true) 
c  in CNF:
c    -b^{2, 294}_2 ∨  b^{2, 294}_1 ∨  b^{2, 294}_0 ∨ false 
c  in DIMACS:
-5528  5529  5530  0

c  3 does not represent an automaton state.
c    -(-b^{2, 294}_2 ∧  b^{2, 294}_1 ∧  b^{2, 294}_0 ∧ true) 
c  in CNF:
c     b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ false 
c  in DIMACS:
 5528 -5529 -5530  0
c  -3 does not represent an automaton state.
c    -( b^{2, 294}_2 ∧  b^{2, 294}_1 ∧  b^{2, 294}_0 ∧ true) 
c  in CNF:
c    -b^{2, 294}_2 ∨ -b^{2, 294}_1 ∨ -b^{2, 294}_0 ∨ false 
c  in DIMACS:
-5528 -5529 -5530  0

c i = 295
c  -2+1 --> -1
c    ( b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧  p_590) -> ( b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0)
c  in CNF:
c    -b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨  b^{2, 296}_2
c    -b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_1
c    -b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨  b^{2, 296}_0
c  in DIMACS:
-5531 -5532  5533 -590  5534 0
-5531 -5532  5533 -590 -5535 0
-5531 -5532  5533 -590  5536 0

c  -1+1 --> 0
c    ( b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0 ∧  p_590) -> (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧ -b^{2, 296}_0)
c  in CNF:
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_2
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_1
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_0
c  in DIMACS:
-5531  5532 -5533 -590 -5534 0
-5531  5532 -5533 -590 -5535 0
-5531  5532 -5533 -590 -5536 0

c  0+1 --> 1
c    (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧  p_590) -> (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0)
c  in CNF:
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_2
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_1
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨  b^{2, 296}_0
c  in DIMACS:
 5531  5532  5533 -590 -5534 0
 5531  5532  5533 -590 -5535 0
 5531  5532  5533 -590  5536 0

c  1+1 --> 2
c    (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0 ∧  p_590) -> (-b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0)
c  in CNF:
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_2
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨  b^{2, 296}_1
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ -p_590 ∨ -b^{2, 296}_0
c  in DIMACS:
 5531  5532 -5533 -590 -5534 0
 5531  5532 -5533 -590  5535 0
 5531  5532 -5533 -590 -5536 0

c  2+1 --> break 
c    (-b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧  p_590) -> break
c  in CNF:
c     b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 5531 -5532  5533 -590 1162 0


c  2-1 --> 1
c    (-b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧ -p_590) -> (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0)
c  in CNF:
c     b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_2
c     b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_1
c     b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨  b^{2, 296}_0
c  in DIMACS:
 5531 -5532  5533  590 -5534 0
 5531 -5532  5533  590 -5535 0
 5531 -5532  5533  590  5536 0

c  1-1 --> 0
c    (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0 ∧ -p_590) -> (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧ -b^{2, 296}_0)
c  in CNF:
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_2
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_1
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_0
c  in DIMACS:
 5531  5532 -5533  590 -5534 0
 5531  5532 -5533  590 -5535 0
 5531  5532 -5533  590 -5536 0

c  0-1 --> -1
c    (-b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧ -p_590) -> ( b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0)
c  in CNF:
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨  b^{2, 296}_2
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_1
c     b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨  b^{2, 296}_0
c  in DIMACS:
 5531  5532  5533  590  5534 0
 5531  5532  5533  590 -5535 0
 5531  5532  5533  590  5536 0

c  -1-1 --> -2
c    ( b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧  b^{2, 295}_0 ∧ -p_590) -> ( b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0)
c  in CNF:
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨  b^{2, 296}_2
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨  b^{2, 296}_1
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨  p_590 ∨ -b^{2, 296}_0
c  in DIMACS:
-5531  5532 -5533  590  5534 0
-5531  5532 -5533  590  5535 0
-5531  5532 -5533  590 -5536 0

c  -2-1 --> break 
c    ( b^{2, 295}_2 ∧  b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨  b^{2, 295}_0 ∨  p_590 ∨ break
c  in DIMACS:
-5531 -5532  5533  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 295}_2 ∧ -b^{2, 295}_1 ∧ -b^{2, 295}_0 ∧ true) 
c  in CNF:
c    -b^{2, 295}_2 ∨  b^{2, 295}_1 ∨  b^{2, 295}_0 ∨ false 
c  in DIMACS:
-5531  5532  5533  0

c  3 does not represent an automaton state.
c    -(-b^{2, 295}_2 ∧  b^{2, 295}_1 ∧  b^{2, 295}_0 ∧ true) 
c  in CNF:
c     b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ false 
c  in DIMACS:
 5531 -5532 -5533  0
c  -3 does not represent an automaton state.
c    -( b^{2, 295}_2 ∧  b^{2, 295}_1 ∧  b^{2, 295}_0 ∧ true) 
c  in CNF:
c    -b^{2, 295}_2 ∨ -b^{2, 295}_1 ∨ -b^{2, 295}_0 ∨ false 
c  in DIMACS:
-5531 -5532 -5533  0

c i = 296
c  -2+1 --> -1
c    ( b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧  p_592) -> ( b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0)
c  in CNF:
c    -b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨  b^{2, 297}_2
c    -b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_1
c    -b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨  b^{2, 297}_0
c  in DIMACS:
-5534 -5535  5536 -592  5537 0
-5534 -5535  5536 -592 -5538 0
-5534 -5535  5536 -592  5539 0

c  -1+1 --> 0
c    ( b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0 ∧  p_592) -> (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧ -b^{2, 297}_0)
c  in CNF:
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_2
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_1
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_0
c  in DIMACS:
-5534  5535 -5536 -592 -5537 0
-5534  5535 -5536 -592 -5538 0
-5534  5535 -5536 -592 -5539 0

c  0+1 --> 1
c    (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧  p_592) -> (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0)
c  in CNF:
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_2
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_1
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨  b^{2, 297}_0
c  in DIMACS:
 5534  5535  5536 -592 -5537 0
 5534  5535  5536 -592 -5538 0
 5534  5535  5536 -592  5539 0

c  1+1 --> 2
c    (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0 ∧  p_592) -> (-b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0)
c  in CNF:
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_2
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨  b^{2, 297}_1
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ -p_592 ∨ -b^{2, 297}_0
c  in DIMACS:
 5534  5535 -5536 -592 -5537 0
 5534  5535 -5536 -592  5538 0
 5534  5535 -5536 -592 -5539 0

c  2+1 --> break 
c    (-b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧  p_592) -> break
c  in CNF:
c     b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 5534 -5535  5536 -592 1162 0


c  2-1 --> 1
c    (-b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧ -p_592) -> (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0)
c  in CNF:
c     b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_2
c     b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_1
c     b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨  b^{2, 297}_0
c  in DIMACS:
 5534 -5535  5536  592 -5537 0
 5534 -5535  5536  592 -5538 0
 5534 -5535  5536  592  5539 0

c  1-1 --> 0
c    (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0 ∧ -p_592) -> (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧ -b^{2, 297}_0)
c  in CNF:
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_2
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_1
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_0
c  in DIMACS:
 5534  5535 -5536  592 -5537 0
 5534  5535 -5536  592 -5538 0
 5534  5535 -5536  592 -5539 0

c  0-1 --> -1
c    (-b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧ -p_592) -> ( b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0)
c  in CNF:
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨  b^{2, 297}_2
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_1
c     b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨  b^{2, 297}_0
c  in DIMACS:
 5534  5535  5536  592  5537 0
 5534  5535  5536  592 -5538 0
 5534  5535  5536  592  5539 0

c  -1-1 --> -2
c    ( b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧  b^{2, 296}_0 ∧ -p_592) -> ( b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0)
c  in CNF:
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨  b^{2, 297}_2
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨  b^{2, 297}_1
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨  p_592 ∨ -b^{2, 297}_0
c  in DIMACS:
-5534  5535 -5536  592  5537 0
-5534  5535 -5536  592  5538 0
-5534  5535 -5536  592 -5539 0

c  -2-1 --> break 
c    ( b^{2, 296}_2 ∧  b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨  b^{2, 296}_0 ∨  p_592 ∨ break
c  in DIMACS:
-5534 -5535  5536  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 296}_2 ∧ -b^{2, 296}_1 ∧ -b^{2, 296}_0 ∧ true) 
c  in CNF:
c    -b^{2, 296}_2 ∨  b^{2, 296}_1 ∨  b^{2, 296}_0 ∨ false 
c  in DIMACS:
-5534  5535  5536  0

c  3 does not represent an automaton state.
c    -(-b^{2, 296}_2 ∧  b^{2, 296}_1 ∧  b^{2, 296}_0 ∧ true) 
c  in CNF:
c     b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ false 
c  in DIMACS:
 5534 -5535 -5536  0
c  -3 does not represent an automaton state.
c    -( b^{2, 296}_2 ∧  b^{2, 296}_1 ∧  b^{2, 296}_0 ∧ true) 
c  in CNF:
c    -b^{2, 296}_2 ∨ -b^{2, 296}_1 ∨ -b^{2, 296}_0 ∨ false 
c  in DIMACS:
-5534 -5535 -5536  0

c i = 297
c  -2+1 --> -1
c    ( b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧  p_594) -> ( b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0)
c  in CNF:
c    -b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨  b^{2, 298}_2
c    -b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_1
c    -b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨  b^{2, 298}_0
c  in DIMACS:
-5537 -5538  5539 -594  5540 0
-5537 -5538  5539 -594 -5541 0
-5537 -5538  5539 -594  5542 0

c  -1+1 --> 0
c    ( b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0 ∧  p_594) -> (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧ -b^{2, 298}_0)
c  in CNF:
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_2
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_1
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_0
c  in DIMACS:
-5537  5538 -5539 -594 -5540 0
-5537  5538 -5539 -594 -5541 0
-5537  5538 -5539 -594 -5542 0

c  0+1 --> 1
c    (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧  p_594) -> (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0)
c  in CNF:
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_2
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_1
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨  b^{2, 298}_0
c  in DIMACS:
 5537  5538  5539 -594 -5540 0
 5537  5538  5539 -594 -5541 0
 5537  5538  5539 -594  5542 0

c  1+1 --> 2
c    (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0 ∧  p_594) -> (-b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0)
c  in CNF:
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_2
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨  b^{2, 298}_1
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ -p_594 ∨ -b^{2, 298}_0
c  in DIMACS:
 5537  5538 -5539 -594 -5540 0
 5537  5538 -5539 -594  5541 0
 5537  5538 -5539 -594 -5542 0

c  2+1 --> break 
c    (-b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧  p_594) -> break
c  in CNF:
c     b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 5537 -5538  5539 -594 1162 0


c  2-1 --> 1
c    (-b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧ -p_594) -> (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0)
c  in CNF:
c     b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_2
c     b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_1
c     b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨  b^{2, 298}_0
c  in DIMACS:
 5537 -5538  5539  594 -5540 0
 5537 -5538  5539  594 -5541 0
 5537 -5538  5539  594  5542 0

c  1-1 --> 0
c    (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0 ∧ -p_594) -> (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧ -b^{2, 298}_0)
c  in CNF:
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_2
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_1
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_0
c  in DIMACS:
 5537  5538 -5539  594 -5540 0
 5537  5538 -5539  594 -5541 0
 5537  5538 -5539  594 -5542 0

c  0-1 --> -1
c    (-b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧ -p_594) -> ( b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0)
c  in CNF:
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨  b^{2, 298}_2
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_1
c     b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨  b^{2, 298}_0
c  in DIMACS:
 5537  5538  5539  594  5540 0
 5537  5538  5539  594 -5541 0
 5537  5538  5539  594  5542 0

c  -1-1 --> -2
c    ( b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧  b^{2, 297}_0 ∧ -p_594) -> ( b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0)
c  in CNF:
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨  b^{2, 298}_2
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨  b^{2, 298}_1
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨  p_594 ∨ -b^{2, 298}_0
c  in DIMACS:
-5537  5538 -5539  594  5540 0
-5537  5538 -5539  594  5541 0
-5537  5538 -5539  594 -5542 0

c  -2-1 --> break 
c    ( b^{2, 297}_2 ∧  b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨  b^{2, 297}_0 ∨  p_594 ∨ break
c  in DIMACS:
-5537 -5538  5539  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 297}_2 ∧ -b^{2, 297}_1 ∧ -b^{2, 297}_0 ∧ true) 
c  in CNF:
c    -b^{2, 297}_2 ∨  b^{2, 297}_1 ∨  b^{2, 297}_0 ∨ false 
c  in DIMACS:
-5537  5538  5539  0

c  3 does not represent an automaton state.
c    -(-b^{2, 297}_2 ∧  b^{2, 297}_1 ∧  b^{2, 297}_0 ∧ true) 
c  in CNF:
c     b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ false 
c  in DIMACS:
 5537 -5538 -5539  0
c  -3 does not represent an automaton state.
c    -( b^{2, 297}_2 ∧  b^{2, 297}_1 ∧  b^{2, 297}_0 ∧ true) 
c  in CNF:
c    -b^{2, 297}_2 ∨ -b^{2, 297}_1 ∨ -b^{2, 297}_0 ∨ false 
c  in DIMACS:
-5537 -5538 -5539  0

c i = 298
c  -2+1 --> -1
c    ( b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧  p_596) -> ( b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0)
c  in CNF:
c    -b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨  b^{2, 299}_2
c    -b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_1
c    -b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨  b^{2, 299}_0
c  in DIMACS:
-5540 -5541  5542 -596  5543 0
-5540 -5541  5542 -596 -5544 0
-5540 -5541  5542 -596  5545 0

c  -1+1 --> 0
c    ( b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0 ∧  p_596) -> (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧ -b^{2, 299}_0)
c  in CNF:
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_2
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_1
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_0
c  in DIMACS:
-5540  5541 -5542 -596 -5543 0
-5540  5541 -5542 -596 -5544 0
-5540  5541 -5542 -596 -5545 0

c  0+1 --> 1
c    (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧  p_596) -> (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0)
c  in CNF:
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_2
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_1
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨  b^{2, 299}_0
c  in DIMACS:
 5540  5541  5542 -596 -5543 0
 5540  5541  5542 -596 -5544 0
 5540  5541  5542 -596  5545 0

c  1+1 --> 2
c    (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0 ∧  p_596) -> (-b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0)
c  in CNF:
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_2
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨  b^{2, 299}_1
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ -p_596 ∨ -b^{2, 299}_0
c  in DIMACS:
 5540  5541 -5542 -596 -5543 0
 5540  5541 -5542 -596  5544 0
 5540  5541 -5542 -596 -5545 0

c  2+1 --> break 
c    (-b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧  p_596) -> break
c  in CNF:
c     b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ -p_596 ∨ break
c  in DIMACS:
 5540 -5541  5542 -596 1162 0


c  2-1 --> 1
c    (-b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧ -p_596) -> (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0)
c  in CNF:
c     b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_2
c     b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_1
c     b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨  b^{2, 299}_0
c  in DIMACS:
 5540 -5541  5542  596 -5543 0
 5540 -5541  5542  596 -5544 0
 5540 -5541  5542  596  5545 0

c  1-1 --> 0
c    (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0 ∧ -p_596) -> (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧ -b^{2, 299}_0)
c  in CNF:
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_2
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_1
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_0
c  in DIMACS:
 5540  5541 -5542  596 -5543 0
 5540  5541 -5542  596 -5544 0
 5540  5541 -5542  596 -5545 0

c  0-1 --> -1
c    (-b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧ -p_596) -> ( b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0)
c  in CNF:
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨  b^{2, 299}_2
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_1
c     b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨  b^{2, 299}_0
c  in DIMACS:
 5540  5541  5542  596  5543 0
 5540  5541  5542  596 -5544 0
 5540  5541  5542  596  5545 0

c  -1-1 --> -2
c    ( b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧  b^{2, 298}_0 ∧ -p_596) -> ( b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0)
c  in CNF:
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨  b^{2, 299}_2
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨  b^{2, 299}_1
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨  p_596 ∨ -b^{2, 299}_0
c  in DIMACS:
-5540  5541 -5542  596  5543 0
-5540  5541 -5542  596  5544 0
-5540  5541 -5542  596 -5545 0

c  -2-1 --> break 
c    ( b^{2, 298}_2 ∧  b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧ -p_596) -> break
c  in CNF:
c    -b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨  b^{2, 298}_0 ∨  p_596 ∨ break
c  in DIMACS:
-5540 -5541  5542  596 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 298}_2 ∧ -b^{2, 298}_1 ∧ -b^{2, 298}_0 ∧ true) 
c  in CNF:
c    -b^{2, 298}_2 ∨  b^{2, 298}_1 ∨  b^{2, 298}_0 ∨ false 
c  in DIMACS:
-5540  5541  5542  0

c  3 does not represent an automaton state.
c    -(-b^{2, 298}_2 ∧  b^{2, 298}_1 ∧  b^{2, 298}_0 ∧ true) 
c  in CNF:
c     b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ false 
c  in DIMACS:
 5540 -5541 -5542  0
c  -3 does not represent an automaton state.
c    -( b^{2, 298}_2 ∧  b^{2, 298}_1 ∧  b^{2, 298}_0 ∧ true) 
c  in CNF:
c    -b^{2, 298}_2 ∨ -b^{2, 298}_1 ∨ -b^{2, 298}_0 ∨ false 
c  in DIMACS:
-5540 -5541 -5542  0

c i = 299
c  -2+1 --> -1
c    ( b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧  p_598) -> ( b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0)
c  in CNF:
c    -b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨  b^{2, 300}_2
c    -b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_1
c    -b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨  b^{2, 300}_0
c  in DIMACS:
-5543 -5544  5545 -598  5546 0
-5543 -5544  5545 -598 -5547 0
-5543 -5544  5545 -598  5548 0

c  -1+1 --> 0
c    ( b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0 ∧  p_598) -> (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧ -b^{2, 300}_0)
c  in CNF:
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_2
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_1
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_0
c  in DIMACS:
-5543  5544 -5545 -598 -5546 0
-5543  5544 -5545 -598 -5547 0
-5543  5544 -5545 -598 -5548 0

c  0+1 --> 1
c    (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧  p_598) -> (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0)
c  in CNF:
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_2
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_1
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨  b^{2, 300}_0
c  in DIMACS:
 5543  5544  5545 -598 -5546 0
 5543  5544  5545 -598 -5547 0
 5543  5544  5545 -598  5548 0

c  1+1 --> 2
c    (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0 ∧  p_598) -> (-b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0)
c  in CNF:
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_2
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨  b^{2, 300}_1
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ -p_598 ∨ -b^{2, 300}_0
c  in DIMACS:
 5543  5544 -5545 -598 -5546 0
 5543  5544 -5545 -598  5547 0
 5543  5544 -5545 -598 -5548 0

c  2+1 --> break 
c    (-b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧  p_598) -> break
c  in CNF:
c     b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 5543 -5544  5545 -598 1162 0


c  2-1 --> 1
c    (-b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧ -p_598) -> (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0)
c  in CNF:
c     b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_2
c     b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_1
c     b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨  b^{2, 300}_0
c  in DIMACS:
 5543 -5544  5545  598 -5546 0
 5543 -5544  5545  598 -5547 0
 5543 -5544  5545  598  5548 0

c  1-1 --> 0
c    (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0 ∧ -p_598) -> (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧ -b^{2, 300}_0)
c  in CNF:
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_2
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_1
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_0
c  in DIMACS:
 5543  5544 -5545  598 -5546 0
 5543  5544 -5545  598 -5547 0
 5543  5544 -5545  598 -5548 0

c  0-1 --> -1
c    (-b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧ -p_598) -> ( b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0)
c  in CNF:
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨  b^{2, 300}_2
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_1
c     b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨  b^{2, 300}_0
c  in DIMACS:
 5543  5544  5545  598  5546 0
 5543  5544  5545  598 -5547 0
 5543  5544  5545  598  5548 0

c  -1-1 --> -2
c    ( b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧  b^{2, 299}_0 ∧ -p_598) -> ( b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0)
c  in CNF:
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨  b^{2, 300}_2
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨  b^{2, 300}_1
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨  p_598 ∨ -b^{2, 300}_0
c  in DIMACS:
-5543  5544 -5545  598  5546 0
-5543  5544 -5545  598  5547 0
-5543  5544 -5545  598 -5548 0

c  -2-1 --> break 
c    ( b^{2, 299}_2 ∧  b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨  b^{2, 299}_0 ∨  p_598 ∨ break
c  in DIMACS:
-5543 -5544  5545  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 299}_2 ∧ -b^{2, 299}_1 ∧ -b^{2, 299}_0 ∧ true) 
c  in CNF:
c    -b^{2, 299}_2 ∨  b^{2, 299}_1 ∨  b^{2, 299}_0 ∨ false 
c  in DIMACS:
-5543  5544  5545  0

c  3 does not represent an automaton state.
c    -(-b^{2, 299}_2 ∧  b^{2, 299}_1 ∧  b^{2, 299}_0 ∧ true) 
c  in CNF:
c     b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ false 
c  in DIMACS:
 5543 -5544 -5545  0
c  -3 does not represent an automaton state.
c    -( b^{2, 299}_2 ∧  b^{2, 299}_1 ∧  b^{2, 299}_0 ∧ true) 
c  in CNF:
c    -b^{2, 299}_2 ∨ -b^{2, 299}_1 ∨ -b^{2, 299}_0 ∨ false 
c  in DIMACS:
-5543 -5544 -5545  0

c i = 300
c  -2+1 --> -1
c    ( b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧  p_600) -> ( b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0)
c  in CNF:
c    -b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨  b^{2, 301}_2
c    -b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_1
c    -b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨  b^{2, 301}_0
c  in DIMACS:
-5546 -5547  5548 -600  5549 0
-5546 -5547  5548 -600 -5550 0
-5546 -5547  5548 -600  5551 0

c  -1+1 --> 0
c    ( b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0 ∧  p_600) -> (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧ -b^{2, 301}_0)
c  in CNF:
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_2
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_1
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_0
c  in DIMACS:
-5546  5547 -5548 -600 -5549 0
-5546  5547 -5548 -600 -5550 0
-5546  5547 -5548 -600 -5551 0

c  0+1 --> 1
c    (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧  p_600) -> (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0)
c  in CNF:
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_2
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_1
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨  b^{2, 301}_0
c  in DIMACS:
 5546  5547  5548 -600 -5549 0
 5546  5547  5548 -600 -5550 0
 5546  5547  5548 -600  5551 0

c  1+1 --> 2
c    (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0 ∧  p_600) -> (-b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0)
c  in CNF:
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_2
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨  b^{2, 301}_1
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ -p_600 ∨ -b^{2, 301}_0
c  in DIMACS:
 5546  5547 -5548 -600 -5549 0
 5546  5547 -5548 -600  5550 0
 5546  5547 -5548 -600 -5551 0

c  2+1 --> break 
c    (-b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧  p_600) -> break
c  in CNF:
c     b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 5546 -5547  5548 -600 1162 0


c  2-1 --> 1
c    (-b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧ -p_600) -> (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0)
c  in CNF:
c     b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_2
c     b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_1
c     b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨  b^{2, 301}_0
c  in DIMACS:
 5546 -5547  5548  600 -5549 0
 5546 -5547  5548  600 -5550 0
 5546 -5547  5548  600  5551 0

c  1-1 --> 0
c    (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0 ∧ -p_600) -> (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧ -b^{2, 301}_0)
c  in CNF:
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_2
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_1
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_0
c  in DIMACS:
 5546  5547 -5548  600 -5549 0
 5546  5547 -5548  600 -5550 0
 5546  5547 -5548  600 -5551 0

c  0-1 --> -1
c    (-b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧ -p_600) -> ( b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0)
c  in CNF:
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨  b^{2, 301}_2
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_1
c     b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨  b^{2, 301}_0
c  in DIMACS:
 5546  5547  5548  600  5549 0
 5546  5547  5548  600 -5550 0
 5546  5547  5548  600  5551 0

c  -1-1 --> -2
c    ( b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧  b^{2, 300}_0 ∧ -p_600) -> ( b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0)
c  in CNF:
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨  b^{2, 301}_2
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨  b^{2, 301}_1
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨  p_600 ∨ -b^{2, 301}_0
c  in DIMACS:
-5546  5547 -5548  600  5549 0
-5546  5547 -5548  600  5550 0
-5546  5547 -5548  600 -5551 0

c  -2-1 --> break 
c    ( b^{2, 300}_2 ∧  b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨  b^{2, 300}_0 ∨  p_600 ∨ break
c  in DIMACS:
-5546 -5547  5548  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 300}_2 ∧ -b^{2, 300}_1 ∧ -b^{2, 300}_0 ∧ true) 
c  in CNF:
c    -b^{2, 300}_2 ∨  b^{2, 300}_1 ∨  b^{2, 300}_0 ∨ false 
c  in DIMACS:
-5546  5547  5548  0

c  3 does not represent an automaton state.
c    -(-b^{2, 300}_2 ∧  b^{2, 300}_1 ∧  b^{2, 300}_0 ∧ true) 
c  in CNF:
c     b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ false 
c  in DIMACS:
 5546 -5547 -5548  0
c  -3 does not represent an automaton state.
c    -( b^{2, 300}_2 ∧  b^{2, 300}_1 ∧  b^{2, 300}_0 ∧ true) 
c  in CNF:
c    -b^{2, 300}_2 ∨ -b^{2, 300}_1 ∨ -b^{2, 300}_0 ∨ false 
c  in DIMACS:
-5546 -5547 -5548  0

c i = 301
c  -2+1 --> -1
c    ( b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧  p_602) -> ( b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0)
c  in CNF:
c    -b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨  b^{2, 302}_2
c    -b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_1
c    -b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨  b^{2, 302}_0
c  in DIMACS:
-5549 -5550  5551 -602  5552 0
-5549 -5550  5551 -602 -5553 0
-5549 -5550  5551 -602  5554 0

c  -1+1 --> 0
c    ( b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0 ∧  p_602) -> (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧ -b^{2, 302}_0)
c  in CNF:
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_2
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_1
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_0
c  in DIMACS:
-5549  5550 -5551 -602 -5552 0
-5549  5550 -5551 -602 -5553 0
-5549  5550 -5551 -602 -5554 0

c  0+1 --> 1
c    (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧  p_602) -> (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0)
c  in CNF:
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_2
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_1
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨  b^{2, 302}_0
c  in DIMACS:
 5549  5550  5551 -602 -5552 0
 5549  5550  5551 -602 -5553 0
 5549  5550  5551 -602  5554 0

c  1+1 --> 2
c    (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0 ∧  p_602) -> (-b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0)
c  in CNF:
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_2
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨  b^{2, 302}_1
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ -p_602 ∨ -b^{2, 302}_0
c  in DIMACS:
 5549  5550 -5551 -602 -5552 0
 5549  5550 -5551 -602  5553 0
 5549  5550 -5551 -602 -5554 0

c  2+1 --> break 
c    (-b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧  p_602) -> break
c  in CNF:
c     b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 5549 -5550  5551 -602 1162 0


c  2-1 --> 1
c    (-b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧ -p_602) -> (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0)
c  in CNF:
c     b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_2
c     b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_1
c     b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨  b^{2, 302}_0
c  in DIMACS:
 5549 -5550  5551  602 -5552 0
 5549 -5550  5551  602 -5553 0
 5549 -5550  5551  602  5554 0

c  1-1 --> 0
c    (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0 ∧ -p_602) -> (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧ -b^{2, 302}_0)
c  in CNF:
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_2
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_1
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_0
c  in DIMACS:
 5549  5550 -5551  602 -5552 0
 5549  5550 -5551  602 -5553 0
 5549  5550 -5551  602 -5554 0

c  0-1 --> -1
c    (-b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧ -p_602) -> ( b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0)
c  in CNF:
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨  b^{2, 302}_2
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_1
c     b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨  b^{2, 302}_0
c  in DIMACS:
 5549  5550  5551  602  5552 0
 5549  5550  5551  602 -5553 0
 5549  5550  5551  602  5554 0

c  -1-1 --> -2
c    ( b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧  b^{2, 301}_0 ∧ -p_602) -> ( b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0)
c  in CNF:
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨  b^{2, 302}_2
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨  b^{2, 302}_1
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨  p_602 ∨ -b^{2, 302}_0
c  in DIMACS:
-5549  5550 -5551  602  5552 0
-5549  5550 -5551  602  5553 0
-5549  5550 -5551  602 -5554 0

c  -2-1 --> break 
c    ( b^{2, 301}_2 ∧  b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨  b^{2, 301}_0 ∨  p_602 ∨ break
c  in DIMACS:
-5549 -5550  5551  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 301}_2 ∧ -b^{2, 301}_1 ∧ -b^{2, 301}_0 ∧ true) 
c  in CNF:
c    -b^{2, 301}_2 ∨  b^{2, 301}_1 ∨  b^{2, 301}_0 ∨ false 
c  in DIMACS:
-5549  5550  5551  0

c  3 does not represent an automaton state.
c    -(-b^{2, 301}_2 ∧  b^{2, 301}_1 ∧  b^{2, 301}_0 ∧ true) 
c  in CNF:
c     b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ false 
c  in DIMACS:
 5549 -5550 -5551  0
c  -3 does not represent an automaton state.
c    -( b^{2, 301}_2 ∧  b^{2, 301}_1 ∧  b^{2, 301}_0 ∧ true) 
c  in CNF:
c    -b^{2, 301}_2 ∨ -b^{2, 301}_1 ∨ -b^{2, 301}_0 ∨ false 
c  in DIMACS:
-5549 -5550 -5551  0

c i = 302
c  -2+1 --> -1
c    ( b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧  p_604) -> ( b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0)
c  in CNF:
c    -b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨  b^{2, 303}_2
c    -b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_1
c    -b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨  b^{2, 303}_0
c  in DIMACS:
-5552 -5553  5554 -604  5555 0
-5552 -5553  5554 -604 -5556 0
-5552 -5553  5554 -604  5557 0

c  -1+1 --> 0
c    ( b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0 ∧  p_604) -> (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧ -b^{2, 303}_0)
c  in CNF:
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_2
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_1
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_0
c  in DIMACS:
-5552  5553 -5554 -604 -5555 0
-5552  5553 -5554 -604 -5556 0
-5552  5553 -5554 -604 -5557 0

c  0+1 --> 1
c    (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧  p_604) -> (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0)
c  in CNF:
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_2
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_1
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨  b^{2, 303}_0
c  in DIMACS:
 5552  5553  5554 -604 -5555 0
 5552  5553  5554 -604 -5556 0
 5552  5553  5554 -604  5557 0

c  1+1 --> 2
c    (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0 ∧  p_604) -> (-b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0)
c  in CNF:
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_2
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨  b^{2, 303}_1
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ -p_604 ∨ -b^{2, 303}_0
c  in DIMACS:
 5552  5553 -5554 -604 -5555 0
 5552  5553 -5554 -604  5556 0
 5552  5553 -5554 -604 -5557 0

c  2+1 --> break 
c    (-b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧  p_604) -> break
c  in CNF:
c     b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ -p_604 ∨ break
c  in DIMACS:
 5552 -5553  5554 -604 1162 0


c  2-1 --> 1
c    (-b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧ -p_604) -> (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0)
c  in CNF:
c     b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_2
c     b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_1
c     b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨  b^{2, 303}_0
c  in DIMACS:
 5552 -5553  5554  604 -5555 0
 5552 -5553  5554  604 -5556 0
 5552 -5553  5554  604  5557 0

c  1-1 --> 0
c    (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0 ∧ -p_604) -> (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧ -b^{2, 303}_0)
c  in CNF:
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_2
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_1
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_0
c  in DIMACS:
 5552  5553 -5554  604 -5555 0
 5552  5553 -5554  604 -5556 0
 5552  5553 -5554  604 -5557 0

c  0-1 --> -1
c    (-b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧ -p_604) -> ( b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0)
c  in CNF:
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨  b^{2, 303}_2
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_1
c     b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨  b^{2, 303}_0
c  in DIMACS:
 5552  5553  5554  604  5555 0
 5552  5553  5554  604 -5556 0
 5552  5553  5554  604  5557 0

c  -1-1 --> -2
c    ( b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧  b^{2, 302}_0 ∧ -p_604) -> ( b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0)
c  in CNF:
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨  b^{2, 303}_2
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨  b^{2, 303}_1
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨  p_604 ∨ -b^{2, 303}_0
c  in DIMACS:
-5552  5553 -5554  604  5555 0
-5552  5553 -5554  604  5556 0
-5552  5553 -5554  604 -5557 0

c  -2-1 --> break 
c    ( b^{2, 302}_2 ∧  b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧ -p_604) -> break
c  in CNF:
c    -b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨  b^{2, 302}_0 ∨  p_604 ∨ break
c  in DIMACS:
-5552 -5553  5554  604 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 302}_2 ∧ -b^{2, 302}_1 ∧ -b^{2, 302}_0 ∧ true) 
c  in CNF:
c    -b^{2, 302}_2 ∨  b^{2, 302}_1 ∨  b^{2, 302}_0 ∨ false 
c  in DIMACS:
-5552  5553  5554  0

c  3 does not represent an automaton state.
c    -(-b^{2, 302}_2 ∧  b^{2, 302}_1 ∧  b^{2, 302}_0 ∧ true) 
c  in CNF:
c     b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ false 
c  in DIMACS:
 5552 -5553 -5554  0
c  -3 does not represent an automaton state.
c    -( b^{2, 302}_2 ∧  b^{2, 302}_1 ∧  b^{2, 302}_0 ∧ true) 
c  in CNF:
c    -b^{2, 302}_2 ∨ -b^{2, 302}_1 ∨ -b^{2, 302}_0 ∨ false 
c  in DIMACS:
-5552 -5553 -5554  0

c i = 303
c  -2+1 --> -1
c    ( b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧  p_606) -> ( b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0)
c  in CNF:
c    -b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨  b^{2, 304}_2
c    -b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_1
c    -b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨  b^{2, 304}_0
c  in DIMACS:
-5555 -5556  5557 -606  5558 0
-5555 -5556  5557 -606 -5559 0
-5555 -5556  5557 -606  5560 0

c  -1+1 --> 0
c    ( b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0 ∧  p_606) -> (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧ -b^{2, 304}_0)
c  in CNF:
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_2
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_1
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_0
c  in DIMACS:
-5555  5556 -5557 -606 -5558 0
-5555  5556 -5557 -606 -5559 0
-5555  5556 -5557 -606 -5560 0

c  0+1 --> 1
c    (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧  p_606) -> (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0)
c  in CNF:
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_2
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_1
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨  b^{2, 304}_0
c  in DIMACS:
 5555  5556  5557 -606 -5558 0
 5555  5556  5557 -606 -5559 0
 5555  5556  5557 -606  5560 0

c  1+1 --> 2
c    (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0 ∧  p_606) -> (-b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0)
c  in CNF:
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_2
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨  b^{2, 304}_1
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ -p_606 ∨ -b^{2, 304}_0
c  in DIMACS:
 5555  5556 -5557 -606 -5558 0
 5555  5556 -5557 -606  5559 0
 5555  5556 -5557 -606 -5560 0

c  2+1 --> break 
c    (-b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧  p_606) -> break
c  in CNF:
c     b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 5555 -5556  5557 -606 1162 0


c  2-1 --> 1
c    (-b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧ -p_606) -> (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0)
c  in CNF:
c     b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_2
c     b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_1
c     b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨  b^{2, 304}_0
c  in DIMACS:
 5555 -5556  5557  606 -5558 0
 5555 -5556  5557  606 -5559 0
 5555 -5556  5557  606  5560 0

c  1-1 --> 0
c    (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0 ∧ -p_606) -> (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧ -b^{2, 304}_0)
c  in CNF:
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_2
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_1
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_0
c  in DIMACS:
 5555  5556 -5557  606 -5558 0
 5555  5556 -5557  606 -5559 0
 5555  5556 -5557  606 -5560 0

c  0-1 --> -1
c    (-b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧ -p_606) -> ( b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0)
c  in CNF:
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨  b^{2, 304}_2
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_1
c     b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨  b^{2, 304}_0
c  in DIMACS:
 5555  5556  5557  606  5558 0
 5555  5556  5557  606 -5559 0
 5555  5556  5557  606  5560 0

c  -1-1 --> -2
c    ( b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧  b^{2, 303}_0 ∧ -p_606) -> ( b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0)
c  in CNF:
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨  b^{2, 304}_2
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨  b^{2, 304}_1
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨  p_606 ∨ -b^{2, 304}_0
c  in DIMACS:
-5555  5556 -5557  606  5558 0
-5555  5556 -5557  606  5559 0
-5555  5556 -5557  606 -5560 0

c  -2-1 --> break 
c    ( b^{2, 303}_2 ∧  b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨  b^{2, 303}_0 ∨  p_606 ∨ break
c  in DIMACS:
-5555 -5556  5557  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 303}_2 ∧ -b^{2, 303}_1 ∧ -b^{2, 303}_0 ∧ true) 
c  in CNF:
c    -b^{2, 303}_2 ∨  b^{2, 303}_1 ∨  b^{2, 303}_0 ∨ false 
c  in DIMACS:
-5555  5556  5557  0

c  3 does not represent an automaton state.
c    -(-b^{2, 303}_2 ∧  b^{2, 303}_1 ∧  b^{2, 303}_0 ∧ true) 
c  in CNF:
c     b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ false 
c  in DIMACS:
 5555 -5556 -5557  0
c  -3 does not represent an automaton state.
c    -( b^{2, 303}_2 ∧  b^{2, 303}_1 ∧  b^{2, 303}_0 ∧ true) 
c  in CNF:
c    -b^{2, 303}_2 ∨ -b^{2, 303}_1 ∨ -b^{2, 303}_0 ∨ false 
c  in DIMACS:
-5555 -5556 -5557  0

c i = 304
c  -2+1 --> -1
c    ( b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧  p_608) -> ( b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0)
c  in CNF:
c    -b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨  b^{2, 305}_2
c    -b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_1
c    -b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨  b^{2, 305}_0
c  in DIMACS:
-5558 -5559  5560 -608  5561 0
-5558 -5559  5560 -608 -5562 0
-5558 -5559  5560 -608  5563 0

c  -1+1 --> 0
c    ( b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0 ∧  p_608) -> (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧ -b^{2, 305}_0)
c  in CNF:
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_2
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_1
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_0
c  in DIMACS:
-5558  5559 -5560 -608 -5561 0
-5558  5559 -5560 -608 -5562 0
-5558  5559 -5560 -608 -5563 0

c  0+1 --> 1
c    (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧  p_608) -> (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0)
c  in CNF:
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_2
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_1
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨  b^{2, 305}_0
c  in DIMACS:
 5558  5559  5560 -608 -5561 0
 5558  5559  5560 -608 -5562 0
 5558  5559  5560 -608  5563 0

c  1+1 --> 2
c    (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0 ∧  p_608) -> (-b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0)
c  in CNF:
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_2
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨  b^{2, 305}_1
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ -p_608 ∨ -b^{2, 305}_0
c  in DIMACS:
 5558  5559 -5560 -608 -5561 0
 5558  5559 -5560 -608  5562 0
 5558  5559 -5560 -608 -5563 0

c  2+1 --> break 
c    (-b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧  p_608) -> break
c  in CNF:
c     b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 5558 -5559  5560 -608 1162 0


c  2-1 --> 1
c    (-b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧ -p_608) -> (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0)
c  in CNF:
c     b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_2
c     b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_1
c     b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨  b^{2, 305}_0
c  in DIMACS:
 5558 -5559  5560  608 -5561 0
 5558 -5559  5560  608 -5562 0
 5558 -5559  5560  608  5563 0

c  1-1 --> 0
c    (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0 ∧ -p_608) -> (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧ -b^{2, 305}_0)
c  in CNF:
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_2
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_1
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_0
c  in DIMACS:
 5558  5559 -5560  608 -5561 0
 5558  5559 -5560  608 -5562 0
 5558  5559 -5560  608 -5563 0

c  0-1 --> -1
c    (-b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧ -p_608) -> ( b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0)
c  in CNF:
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨  b^{2, 305}_2
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_1
c     b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨  b^{2, 305}_0
c  in DIMACS:
 5558  5559  5560  608  5561 0
 5558  5559  5560  608 -5562 0
 5558  5559  5560  608  5563 0

c  -1-1 --> -2
c    ( b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧  b^{2, 304}_0 ∧ -p_608) -> ( b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0)
c  in CNF:
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨  b^{2, 305}_2
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨  b^{2, 305}_1
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨  p_608 ∨ -b^{2, 305}_0
c  in DIMACS:
-5558  5559 -5560  608  5561 0
-5558  5559 -5560  608  5562 0
-5558  5559 -5560  608 -5563 0

c  -2-1 --> break 
c    ( b^{2, 304}_2 ∧  b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨  b^{2, 304}_0 ∨  p_608 ∨ break
c  in DIMACS:
-5558 -5559  5560  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 304}_2 ∧ -b^{2, 304}_1 ∧ -b^{2, 304}_0 ∧ true) 
c  in CNF:
c    -b^{2, 304}_2 ∨  b^{2, 304}_1 ∨  b^{2, 304}_0 ∨ false 
c  in DIMACS:
-5558  5559  5560  0

c  3 does not represent an automaton state.
c    -(-b^{2, 304}_2 ∧  b^{2, 304}_1 ∧  b^{2, 304}_0 ∧ true) 
c  in CNF:
c     b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ false 
c  in DIMACS:
 5558 -5559 -5560  0
c  -3 does not represent an automaton state.
c    -( b^{2, 304}_2 ∧  b^{2, 304}_1 ∧  b^{2, 304}_0 ∧ true) 
c  in CNF:
c    -b^{2, 304}_2 ∨ -b^{2, 304}_1 ∨ -b^{2, 304}_0 ∨ false 
c  in DIMACS:
-5558 -5559 -5560  0

c i = 305
c  -2+1 --> -1
c    ( b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧  p_610) -> ( b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0)
c  in CNF:
c    -b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨  b^{2, 306}_2
c    -b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_1
c    -b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨  b^{2, 306}_0
c  in DIMACS:
-5561 -5562  5563 -610  5564 0
-5561 -5562  5563 -610 -5565 0
-5561 -5562  5563 -610  5566 0

c  -1+1 --> 0
c    ( b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0 ∧  p_610) -> (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧ -b^{2, 306}_0)
c  in CNF:
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_2
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_1
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_0
c  in DIMACS:
-5561  5562 -5563 -610 -5564 0
-5561  5562 -5563 -610 -5565 0
-5561  5562 -5563 -610 -5566 0

c  0+1 --> 1
c    (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧  p_610) -> (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0)
c  in CNF:
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_2
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_1
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨  b^{2, 306}_0
c  in DIMACS:
 5561  5562  5563 -610 -5564 0
 5561  5562  5563 -610 -5565 0
 5561  5562  5563 -610  5566 0

c  1+1 --> 2
c    (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0 ∧  p_610) -> (-b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0)
c  in CNF:
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_2
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨  b^{2, 306}_1
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ -p_610 ∨ -b^{2, 306}_0
c  in DIMACS:
 5561  5562 -5563 -610 -5564 0
 5561  5562 -5563 -610  5565 0
 5561  5562 -5563 -610 -5566 0

c  2+1 --> break 
c    (-b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧  p_610) -> break
c  in CNF:
c     b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 5561 -5562  5563 -610 1162 0


c  2-1 --> 1
c    (-b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧ -p_610) -> (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0)
c  in CNF:
c     b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_2
c     b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_1
c     b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨  b^{2, 306}_0
c  in DIMACS:
 5561 -5562  5563  610 -5564 0
 5561 -5562  5563  610 -5565 0
 5561 -5562  5563  610  5566 0

c  1-1 --> 0
c    (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0 ∧ -p_610) -> (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧ -b^{2, 306}_0)
c  in CNF:
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_2
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_1
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_0
c  in DIMACS:
 5561  5562 -5563  610 -5564 0
 5561  5562 -5563  610 -5565 0
 5561  5562 -5563  610 -5566 0

c  0-1 --> -1
c    (-b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧ -p_610) -> ( b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0)
c  in CNF:
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨  b^{2, 306}_2
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_1
c     b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨  b^{2, 306}_0
c  in DIMACS:
 5561  5562  5563  610  5564 0
 5561  5562  5563  610 -5565 0
 5561  5562  5563  610  5566 0

c  -1-1 --> -2
c    ( b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧  b^{2, 305}_0 ∧ -p_610) -> ( b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0)
c  in CNF:
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨  b^{2, 306}_2
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨  b^{2, 306}_1
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨  p_610 ∨ -b^{2, 306}_0
c  in DIMACS:
-5561  5562 -5563  610  5564 0
-5561  5562 -5563  610  5565 0
-5561  5562 -5563  610 -5566 0

c  -2-1 --> break 
c    ( b^{2, 305}_2 ∧  b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨  b^{2, 305}_0 ∨  p_610 ∨ break
c  in DIMACS:
-5561 -5562  5563  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 305}_2 ∧ -b^{2, 305}_1 ∧ -b^{2, 305}_0 ∧ true) 
c  in CNF:
c    -b^{2, 305}_2 ∨  b^{2, 305}_1 ∨  b^{2, 305}_0 ∨ false 
c  in DIMACS:
-5561  5562  5563  0

c  3 does not represent an automaton state.
c    -(-b^{2, 305}_2 ∧  b^{2, 305}_1 ∧  b^{2, 305}_0 ∧ true) 
c  in CNF:
c     b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ false 
c  in DIMACS:
 5561 -5562 -5563  0
c  -3 does not represent an automaton state.
c    -( b^{2, 305}_2 ∧  b^{2, 305}_1 ∧  b^{2, 305}_0 ∧ true) 
c  in CNF:
c    -b^{2, 305}_2 ∨ -b^{2, 305}_1 ∨ -b^{2, 305}_0 ∨ false 
c  in DIMACS:
-5561 -5562 -5563  0

c i = 306
c  -2+1 --> -1
c    ( b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧  p_612) -> ( b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0)
c  in CNF:
c    -b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨  b^{2, 307}_2
c    -b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_1
c    -b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨  b^{2, 307}_0
c  in DIMACS:
-5564 -5565  5566 -612  5567 0
-5564 -5565  5566 -612 -5568 0
-5564 -5565  5566 -612  5569 0

c  -1+1 --> 0
c    ( b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0 ∧  p_612) -> (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧ -b^{2, 307}_0)
c  in CNF:
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_2
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_1
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_0
c  in DIMACS:
-5564  5565 -5566 -612 -5567 0
-5564  5565 -5566 -612 -5568 0
-5564  5565 -5566 -612 -5569 0

c  0+1 --> 1
c    (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧  p_612) -> (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0)
c  in CNF:
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_2
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_1
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨  b^{2, 307}_0
c  in DIMACS:
 5564  5565  5566 -612 -5567 0
 5564  5565  5566 -612 -5568 0
 5564  5565  5566 -612  5569 0

c  1+1 --> 2
c    (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0 ∧  p_612) -> (-b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0)
c  in CNF:
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_2
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨  b^{2, 307}_1
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ -p_612 ∨ -b^{2, 307}_0
c  in DIMACS:
 5564  5565 -5566 -612 -5567 0
 5564  5565 -5566 -612  5568 0
 5564  5565 -5566 -612 -5569 0

c  2+1 --> break 
c    (-b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧  p_612) -> break
c  in CNF:
c     b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 5564 -5565  5566 -612 1162 0


c  2-1 --> 1
c    (-b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧ -p_612) -> (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0)
c  in CNF:
c     b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_2
c     b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_1
c     b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨  b^{2, 307}_0
c  in DIMACS:
 5564 -5565  5566  612 -5567 0
 5564 -5565  5566  612 -5568 0
 5564 -5565  5566  612  5569 0

c  1-1 --> 0
c    (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0 ∧ -p_612) -> (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧ -b^{2, 307}_0)
c  in CNF:
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_2
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_1
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_0
c  in DIMACS:
 5564  5565 -5566  612 -5567 0
 5564  5565 -5566  612 -5568 0
 5564  5565 -5566  612 -5569 0

c  0-1 --> -1
c    (-b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧ -p_612) -> ( b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0)
c  in CNF:
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨  b^{2, 307}_2
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_1
c     b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨  b^{2, 307}_0
c  in DIMACS:
 5564  5565  5566  612  5567 0
 5564  5565  5566  612 -5568 0
 5564  5565  5566  612  5569 0

c  -1-1 --> -2
c    ( b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧  b^{2, 306}_0 ∧ -p_612) -> ( b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0)
c  in CNF:
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨  b^{2, 307}_2
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨  b^{2, 307}_1
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨  p_612 ∨ -b^{2, 307}_0
c  in DIMACS:
-5564  5565 -5566  612  5567 0
-5564  5565 -5566  612  5568 0
-5564  5565 -5566  612 -5569 0

c  -2-1 --> break 
c    ( b^{2, 306}_2 ∧  b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨  b^{2, 306}_0 ∨  p_612 ∨ break
c  in DIMACS:
-5564 -5565  5566  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 306}_2 ∧ -b^{2, 306}_1 ∧ -b^{2, 306}_0 ∧ true) 
c  in CNF:
c    -b^{2, 306}_2 ∨  b^{2, 306}_1 ∨  b^{2, 306}_0 ∨ false 
c  in DIMACS:
-5564  5565  5566  0

c  3 does not represent an automaton state.
c    -(-b^{2, 306}_2 ∧  b^{2, 306}_1 ∧  b^{2, 306}_0 ∧ true) 
c  in CNF:
c     b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ false 
c  in DIMACS:
 5564 -5565 -5566  0
c  -3 does not represent an automaton state.
c    -( b^{2, 306}_2 ∧  b^{2, 306}_1 ∧  b^{2, 306}_0 ∧ true) 
c  in CNF:
c    -b^{2, 306}_2 ∨ -b^{2, 306}_1 ∨ -b^{2, 306}_0 ∨ false 
c  in DIMACS:
-5564 -5565 -5566  0

c i = 307
c  -2+1 --> -1
c    ( b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧  p_614) -> ( b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0)
c  in CNF:
c    -b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨  b^{2, 308}_2
c    -b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_1
c    -b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨  b^{2, 308}_0
c  in DIMACS:
-5567 -5568  5569 -614  5570 0
-5567 -5568  5569 -614 -5571 0
-5567 -5568  5569 -614  5572 0

c  -1+1 --> 0
c    ( b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0 ∧  p_614) -> (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧ -b^{2, 308}_0)
c  in CNF:
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_2
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_1
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_0
c  in DIMACS:
-5567  5568 -5569 -614 -5570 0
-5567  5568 -5569 -614 -5571 0
-5567  5568 -5569 -614 -5572 0

c  0+1 --> 1
c    (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧  p_614) -> (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0)
c  in CNF:
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_2
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_1
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨  b^{2, 308}_0
c  in DIMACS:
 5567  5568  5569 -614 -5570 0
 5567  5568  5569 -614 -5571 0
 5567  5568  5569 -614  5572 0

c  1+1 --> 2
c    (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0 ∧  p_614) -> (-b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0)
c  in CNF:
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_2
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨  b^{2, 308}_1
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ -p_614 ∨ -b^{2, 308}_0
c  in DIMACS:
 5567  5568 -5569 -614 -5570 0
 5567  5568 -5569 -614  5571 0
 5567  5568 -5569 -614 -5572 0

c  2+1 --> break 
c    (-b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧  p_614) -> break
c  in CNF:
c     b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ -p_614 ∨ break
c  in DIMACS:
 5567 -5568  5569 -614 1162 0


c  2-1 --> 1
c    (-b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧ -p_614) -> (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0)
c  in CNF:
c     b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_2
c     b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_1
c     b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨  b^{2, 308}_0
c  in DIMACS:
 5567 -5568  5569  614 -5570 0
 5567 -5568  5569  614 -5571 0
 5567 -5568  5569  614  5572 0

c  1-1 --> 0
c    (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0 ∧ -p_614) -> (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧ -b^{2, 308}_0)
c  in CNF:
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_2
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_1
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_0
c  in DIMACS:
 5567  5568 -5569  614 -5570 0
 5567  5568 -5569  614 -5571 0
 5567  5568 -5569  614 -5572 0

c  0-1 --> -1
c    (-b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧ -p_614) -> ( b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0)
c  in CNF:
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨  b^{2, 308}_2
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_1
c     b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨  b^{2, 308}_0
c  in DIMACS:
 5567  5568  5569  614  5570 0
 5567  5568  5569  614 -5571 0
 5567  5568  5569  614  5572 0

c  -1-1 --> -2
c    ( b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧  b^{2, 307}_0 ∧ -p_614) -> ( b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0)
c  in CNF:
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨  b^{2, 308}_2
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨  b^{2, 308}_1
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨  p_614 ∨ -b^{2, 308}_0
c  in DIMACS:
-5567  5568 -5569  614  5570 0
-5567  5568 -5569  614  5571 0
-5567  5568 -5569  614 -5572 0

c  -2-1 --> break 
c    ( b^{2, 307}_2 ∧  b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧ -p_614) -> break
c  in CNF:
c    -b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨  b^{2, 307}_0 ∨  p_614 ∨ break
c  in DIMACS:
-5567 -5568  5569  614 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 307}_2 ∧ -b^{2, 307}_1 ∧ -b^{2, 307}_0 ∧ true) 
c  in CNF:
c    -b^{2, 307}_2 ∨  b^{2, 307}_1 ∨  b^{2, 307}_0 ∨ false 
c  in DIMACS:
-5567  5568  5569  0

c  3 does not represent an automaton state.
c    -(-b^{2, 307}_2 ∧  b^{2, 307}_1 ∧  b^{2, 307}_0 ∧ true) 
c  in CNF:
c     b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ false 
c  in DIMACS:
 5567 -5568 -5569  0
c  -3 does not represent an automaton state.
c    -( b^{2, 307}_2 ∧  b^{2, 307}_1 ∧  b^{2, 307}_0 ∧ true) 
c  in CNF:
c    -b^{2, 307}_2 ∨ -b^{2, 307}_1 ∨ -b^{2, 307}_0 ∨ false 
c  in DIMACS:
-5567 -5568 -5569  0

c i = 308
c  -2+1 --> -1
c    ( b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧  p_616) -> ( b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0)
c  in CNF:
c    -b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨  b^{2, 309}_2
c    -b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_1
c    -b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨  b^{2, 309}_0
c  in DIMACS:
-5570 -5571  5572 -616  5573 0
-5570 -5571  5572 -616 -5574 0
-5570 -5571  5572 -616  5575 0

c  -1+1 --> 0
c    ( b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0 ∧  p_616) -> (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧ -b^{2, 309}_0)
c  in CNF:
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_2
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_1
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_0
c  in DIMACS:
-5570  5571 -5572 -616 -5573 0
-5570  5571 -5572 -616 -5574 0
-5570  5571 -5572 -616 -5575 0

c  0+1 --> 1
c    (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧  p_616) -> (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0)
c  in CNF:
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_2
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_1
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨  b^{2, 309}_0
c  in DIMACS:
 5570  5571  5572 -616 -5573 0
 5570  5571  5572 -616 -5574 0
 5570  5571  5572 -616  5575 0

c  1+1 --> 2
c    (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0 ∧  p_616) -> (-b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0)
c  in CNF:
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_2
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨  b^{2, 309}_1
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ -p_616 ∨ -b^{2, 309}_0
c  in DIMACS:
 5570  5571 -5572 -616 -5573 0
 5570  5571 -5572 -616  5574 0
 5570  5571 -5572 -616 -5575 0

c  2+1 --> break 
c    (-b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧  p_616) -> break
c  in CNF:
c     b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 5570 -5571  5572 -616 1162 0


c  2-1 --> 1
c    (-b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧ -p_616) -> (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0)
c  in CNF:
c     b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_2
c     b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_1
c     b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨  b^{2, 309}_0
c  in DIMACS:
 5570 -5571  5572  616 -5573 0
 5570 -5571  5572  616 -5574 0
 5570 -5571  5572  616  5575 0

c  1-1 --> 0
c    (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0 ∧ -p_616) -> (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧ -b^{2, 309}_0)
c  in CNF:
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_2
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_1
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_0
c  in DIMACS:
 5570  5571 -5572  616 -5573 0
 5570  5571 -5572  616 -5574 0
 5570  5571 -5572  616 -5575 0

c  0-1 --> -1
c    (-b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧ -p_616) -> ( b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0)
c  in CNF:
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨  b^{2, 309}_2
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_1
c     b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨  b^{2, 309}_0
c  in DIMACS:
 5570  5571  5572  616  5573 0
 5570  5571  5572  616 -5574 0
 5570  5571  5572  616  5575 0

c  -1-1 --> -2
c    ( b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧  b^{2, 308}_0 ∧ -p_616) -> ( b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0)
c  in CNF:
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨  b^{2, 309}_2
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨  b^{2, 309}_1
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨  p_616 ∨ -b^{2, 309}_0
c  in DIMACS:
-5570  5571 -5572  616  5573 0
-5570  5571 -5572  616  5574 0
-5570  5571 -5572  616 -5575 0

c  -2-1 --> break 
c    ( b^{2, 308}_2 ∧  b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨  b^{2, 308}_0 ∨  p_616 ∨ break
c  in DIMACS:
-5570 -5571  5572  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 308}_2 ∧ -b^{2, 308}_1 ∧ -b^{2, 308}_0 ∧ true) 
c  in CNF:
c    -b^{2, 308}_2 ∨  b^{2, 308}_1 ∨  b^{2, 308}_0 ∨ false 
c  in DIMACS:
-5570  5571  5572  0

c  3 does not represent an automaton state.
c    -(-b^{2, 308}_2 ∧  b^{2, 308}_1 ∧  b^{2, 308}_0 ∧ true) 
c  in CNF:
c     b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ false 
c  in DIMACS:
 5570 -5571 -5572  0
c  -3 does not represent an automaton state.
c    -( b^{2, 308}_2 ∧  b^{2, 308}_1 ∧  b^{2, 308}_0 ∧ true) 
c  in CNF:
c    -b^{2, 308}_2 ∨ -b^{2, 308}_1 ∨ -b^{2, 308}_0 ∨ false 
c  in DIMACS:
-5570 -5571 -5572  0

c i = 309
c  -2+1 --> -1
c    ( b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧  p_618) -> ( b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0)
c  in CNF:
c    -b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨  b^{2, 310}_2
c    -b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_1
c    -b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨  b^{2, 310}_0
c  in DIMACS:
-5573 -5574  5575 -618  5576 0
-5573 -5574  5575 -618 -5577 0
-5573 -5574  5575 -618  5578 0

c  -1+1 --> 0
c    ( b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0 ∧  p_618) -> (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧ -b^{2, 310}_0)
c  in CNF:
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_2
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_1
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_0
c  in DIMACS:
-5573  5574 -5575 -618 -5576 0
-5573  5574 -5575 -618 -5577 0
-5573  5574 -5575 -618 -5578 0

c  0+1 --> 1
c    (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧  p_618) -> (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0)
c  in CNF:
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_2
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_1
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨  b^{2, 310}_0
c  in DIMACS:
 5573  5574  5575 -618 -5576 0
 5573  5574  5575 -618 -5577 0
 5573  5574  5575 -618  5578 0

c  1+1 --> 2
c    (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0 ∧  p_618) -> (-b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0)
c  in CNF:
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_2
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨  b^{2, 310}_1
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ -p_618 ∨ -b^{2, 310}_0
c  in DIMACS:
 5573  5574 -5575 -618 -5576 0
 5573  5574 -5575 -618  5577 0
 5573  5574 -5575 -618 -5578 0

c  2+1 --> break 
c    (-b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧  p_618) -> break
c  in CNF:
c     b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 5573 -5574  5575 -618 1162 0


c  2-1 --> 1
c    (-b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧ -p_618) -> (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0)
c  in CNF:
c     b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_2
c     b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_1
c     b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨  b^{2, 310}_0
c  in DIMACS:
 5573 -5574  5575  618 -5576 0
 5573 -5574  5575  618 -5577 0
 5573 -5574  5575  618  5578 0

c  1-1 --> 0
c    (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0 ∧ -p_618) -> (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧ -b^{2, 310}_0)
c  in CNF:
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_2
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_1
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_0
c  in DIMACS:
 5573  5574 -5575  618 -5576 0
 5573  5574 -5575  618 -5577 0
 5573  5574 -5575  618 -5578 0

c  0-1 --> -1
c    (-b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧ -p_618) -> ( b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0)
c  in CNF:
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨  b^{2, 310}_2
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_1
c     b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨  b^{2, 310}_0
c  in DIMACS:
 5573  5574  5575  618  5576 0
 5573  5574  5575  618 -5577 0
 5573  5574  5575  618  5578 0

c  -1-1 --> -2
c    ( b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧  b^{2, 309}_0 ∧ -p_618) -> ( b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0)
c  in CNF:
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨  b^{2, 310}_2
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨  b^{2, 310}_1
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨  p_618 ∨ -b^{2, 310}_0
c  in DIMACS:
-5573  5574 -5575  618  5576 0
-5573  5574 -5575  618  5577 0
-5573  5574 -5575  618 -5578 0

c  -2-1 --> break 
c    ( b^{2, 309}_2 ∧  b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨  b^{2, 309}_0 ∨  p_618 ∨ break
c  in DIMACS:
-5573 -5574  5575  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 309}_2 ∧ -b^{2, 309}_1 ∧ -b^{2, 309}_0 ∧ true) 
c  in CNF:
c    -b^{2, 309}_2 ∨  b^{2, 309}_1 ∨  b^{2, 309}_0 ∨ false 
c  in DIMACS:
-5573  5574  5575  0

c  3 does not represent an automaton state.
c    -(-b^{2, 309}_2 ∧  b^{2, 309}_1 ∧  b^{2, 309}_0 ∧ true) 
c  in CNF:
c     b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ false 
c  in DIMACS:
 5573 -5574 -5575  0
c  -3 does not represent an automaton state.
c    -( b^{2, 309}_2 ∧  b^{2, 309}_1 ∧  b^{2, 309}_0 ∧ true) 
c  in CNF:
c    -b^{2, 309}_2 ∨ -b^{2, 309}_1 ∨ -b^{2, 309}_0 ∨ false 
c  in DIMACS:
-5573 -5574 -5575  0

c i = 310
c  -2+1 --> -1
c    ( b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧  p_620) -> ( b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0)
c  in CNF:
c    -b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨  b^{2, 311}_2
c    -b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_1
c    -b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨  b^{2, 311}_0
c  in DIMACS:
-5576 -5577  5578 -620  5579 0
-5576 -5577  5578 -620 -5580 0
-5576 -5577  5578 -620  5581 0

c  -1+1 --> 0
c    ( b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0 ∧  p_620) -> (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧ -b^{2, 311}_0)
c  in CNF:
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_2
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_1
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_0
c  in DIMACS:
-5576  5577 -5578 -620 -5579 0
-5576  5577 -5578 -620 -5580 0
-5576  5577 -5578 -620 -5581 0

c  0+1 --> 1
c    (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧  p_620) -> (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0)
c  in CNF:
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_2
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_1
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨  b^{2, 311}_0
c  in DIMACS:
 5576  5577  5578 -620 -5579 0
 5576  5577  5578 -620 -5580 0
 5576  5577  5578 -620  5581 0

c  1+1 --> 2
c    (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0 ∧  p_620) -> (-b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0)
c  in CNF:
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_2
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨  b^{2, 311}_1
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ -p_620 ∨ -b^{2, 311}_0
c  in DIMACS:
 5576  5577 -5578 -620 -5579 0
 5576  5577 -5578 -620  5580 0
 5576  5577 -5578 -620 -5581 0

c  2+1 --> break 
c    (-b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧  p_620) -> break
c  in CNF:
c     b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 5576 -5577  5578 -620 1162 0


c  2-1 --> 1
c    (-b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧ -p_620) -> (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0)
c  in CNF:
c     b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_2
c     b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_1
c     b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨  b^{2, 311}_0
c  in DIMACS:
 5576 -5577  5578  620 -5579 0
 5576 -5577  5578  620 -5580 0
 5576 -5577  5578  620  5581 0

c  1-1 --> 0
c    (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0 ∧ -p_620) -> (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧ -b^{2, 311}_0)
c  in CNF:
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_2
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_1
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_0
c  in DIMACS:
 5576  5577 -5578  620 -5579 0
 5576  5577 -5578  620 -5580 0
 5576  5577 -5578  620 -5581 0

c  0-1 --> -1
c    (-b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧ -p_620) -> ( b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0)
c  in CNF:
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨  b^{2, 311}_2
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_1
c     b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨  b^{2, 311}_0
c  in DIMACS:
 5576  5577  5578  620  5579 0
 5576  5577  5578  620 -5580 0
 5576  5577  5578  620  5581 0

c  -1-1 --> -2
c    ( b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧  b^{2, 310}_0 ∧ -p_620) -> ( b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0)
c  in CNF:
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨  b^{2, 311}_2
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨  b^{2, 311}_1
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨  p_620 ∨ -b^{2, 311}_0
c  in DIMACS:
-5576  5577 -5578  620  5579 0
-5576  5577 -5578  620  5580 0
-5576  5577 -5578  620 -5581 0

c  -2-1 --> break 
c    ( b^{2, 310}_2 ∧  b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨  b^{2, 310}_0 ∨  p_620 ∨ break
c  in DIMACS:
-5576 -5577  5578  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 310}_2 ∧ -b^{2, 310}_1 ∧ -b^{2, 310}_0 ∧ true) 
c  in CNF:
c    -b^{2, 310}_2 ∨  b^{2, 310}_1 ∨  b^{2, 310}_0 ∨ false 
c  in DIMACS:
-5576  5577  5578  0

c  3 does not represent an automaton state.
c    -(-b^{2, 310}_2 ∧  b^{2, 310}_1 ∧  b^{2, 310}_0 ∧ true) 
c  in CNF:
c     b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ false 
c  in DIMACS:
 5576 -5577 -5578  0
c  -3 does not represent an automaton state.
c    -( b^{2, 310}_2 ∧  b^{2, 310}_1 ∧  b^{2, 310}_0 ∧ true) 
c  in CNF:
c    -b^{2, 310}_2 ∨ -b^{2, 310}_1 ∨ -b^{2, 310}_0 ∨ false 
c  in DIMACS:
-5576 -5577 -5578  0

c i = 311
c  -2+1 --> -1
c    ( b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧  p_622) -> ( b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0)
c  in CNF:
c    -b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨  b^{2, 312}_2
c    -b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_1
c    -b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨  b^{2, 312}_0
c  in DIMACS:
-5579 -5580  5581 -622  5582 0
-5579 -5580  5581 -622 -5583 0
-5579 -5580  5581 -622  5584 0

c  -1+1 --> 0
c    ( b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0 ∧  p_622) -> (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧ -b^{2, 312}_0)
c  in CNF:
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_2
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_1
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_0
c  in DIMACS:
-5579  5580 -5581 -622 -5582 0
-5579  5580 -5581 -622 -5583 0
-5579  5580 -5581 -622 -5584 0

c  0+1 --> 1
c    (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧  p_622) -> (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0)
c  in CNF:
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_2
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_1
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨  b^{2, 312}_0
c  in DIMACS:
 5579  5580  5581 -622 -5582 0
 5579  5580  5581 -622 -5583 0
 5579  5580  5581 -622  5584 0

c  1+1 --> 2
c    (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0 ∧  p_622) -> (-b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0)
c  in CNF:
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_2
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨  b^{2, 312}_1
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ -p_622 ∨ -b^{2, 312}_0
c  in DIMACS:
 5579  5580 -5581 -622 -5582 0
 5579  5580 -5581 -622  5583 0
 5579  5580 -5581 -622 -5584 0

c  2+1 --> break 
c    (-b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧  p_622) -> break
c  in CNF:
c     b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ -p_622 ∨ break
c  in DIMACS:
 5579 -5580  5581 -622 1162 0


c  2-1 --> 1
c    (-b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧ -p_622) -> (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0)
c  in CNF:
c     b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_2
c     b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_1
c     b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨  b^{2, 312}_0
c  in DIMACS:
 5579 -5580  5581  622 -5582 0
 5579 -5580  5581  622 -5583 0
 5579 -5580  5581  622  5584 0

c  1-1 --> 0
c    (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0 ∧ -p_622) -> (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧ -b^{2, 312}_0)
c  in CNF:
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_2
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_1
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_0
c  in DIMACS:
 5579  5580 -5581  622 -5582 0
 5579  5580 -5581  622 -5583 0
 5579  5580 -5581  622 -5584 0

c  0-1 --> -1
c    (-b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧ -p_622) -> ( b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0)
c  in CNF:
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨  b^{2, 312}_2
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_1
c     b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨  b^{2, 312}_0
c  in DIMACS:
 5579  5580  5581  622  5582 0
 5579  5580  5581  622 -5583 0
 5579  5580  5581  622  5584 0

c  -1-1 --> -2
c    ( b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧  b^{2, 311}_0 ∧ -p_622) -> ( b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0)
c  in CNF:
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨  b^{2, 312}_2
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨  b^{2, 312}_1
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨  p_622 ∨ -b^{2, 312}_0
c  in DIMACS:
-5579  5580 -5581  622  5582 0
-5579  5580 -5581  622  5583 0
-5579  5580 -5581  622 -5584 0

c  -2-1 --> break 
c    ( b^{2, 311}_2 ∧  b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧ -p_622) -> break
c  in CNF:
c    -b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨  b^{2, 311}_0 ∨  p_622 ∨ break
c  in DIMACS:
-5579 -5580  5581  622 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 311}_2 ∧ -b^{2, 311}_1 ∧ -b^{2, 311}_0 ∧ true) 
c  in CNF:
c    -b^{2, 311}_2 ∨  b^{2, 311}_1 ∨  b^{2, 311}_0 ∨ false 
c  in DIMACS:
-5579  5580  5581  0

c  3 does not represent an automaton state.
c    -(-b^{2, 311}_2 ∧  b^{2, 311}_1 ∧  b^{2, 311}_0 ∧ true) 
c  in CNF:
c     b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ false 
c  in DIMACS:
 5579 -5580 -5581  0
c  -3 does not represent an automaton state.
c    -( b^{2, 311}_2 ∧  b^{2, 311}_1 ∧  b^{2, 311}_0 ∧ true) 
c  in CNF:
c    -b^{2, 311}_2 ∨ -b^{2, 311}_1 ∨ -b^{2, 311}_0 ∨ false 
c  in DIMACS:
-5579 -5580 -5581  0

c i = 312
c  -2+1 --> -1
c    ( b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧  p_624) -> ( b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0)
c  in CNF:
c    -b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨  b^{2, 313}_2
c    -b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_1
c    -b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨  b^{2, 313}_0
c  in DIMACS:
-5582 -5583  5584 -624  5585 0
-5582 -5583  5584 -624 -5586 0
-5582 -5583  5584 -624  5587 0

c  -1+1 --> 0
c    ( b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0 ∧  p_624) -> (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧ -b^{2, 313}_0)
c  in CNF:
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_2
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_1
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_0
c  in DIMACS:
-5582  5583 -5584 -624 -5585 0
-5582  5583 -5584 -624 -5586 0
-5582  5583 -5584 -624 -5587 0

c  0+1 --> 1
c    (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧  p_624) -> (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0)
c  in CNF:
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_2
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_1
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨  b^{2, 313}_0
c  in DIMACS:
 5582  5583  5584 -624 -5585 0
 5582  5583  5584 -624 -5586 0
 5582  5583  5584 -624  5587 0

c  1+1 --> 2
c    (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0 ∧  p_624) -> (-b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0)
c  in CNF:
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_2
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨  b^{2, 313}_1
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ -p_624 ∨ -b^{2, 313}_0
c  in DIMACS:
 5582  5583 -5584 -624 -5585 0
 5582  5583 -5584 -624  5586 0
 5582  5583 -5584 -624 -5587 0

c  2+1 --> break 
c    (-b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧  p_624) -> break
c  in CNF:
c     b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 5582 -5583  5584 -624 1162 0


c  2-1 --> 1
c    (-b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧ -p_624) -> (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0)
c  in CNF:
c     b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_2
c     b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_1
c     b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨  b^{2, 313}_0
c  in DIMACS:
 5582 -5583  5584  624 -5585 0
 5582 -5583  5584  624 -5586 0
 5582 -5583  5584  624  5587 0

c  1-1 --> 0
c    (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0 ∧ -p_624) -> (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧ -b^{2, 313}_0)
c  in CNF:
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_2
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_1
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_0
c  in DIMACS:
 5582  5583 -5584  624 -5585 0
 5582  5583 -5584  624 -5586 0
 5582  5583 -5584  624 -5587 0

c  0-1 --> -1
c    (-b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧ -p_624) -> ( b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0)
c  in CNF:
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨  b^{2, 313}_2
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_1
c     b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨  b^{2, 313}_0
c  in DIMACS:
 5582  5583  5584  624  5585 0
 5582  5583  5584  624 -5586 0
 5582  5583  5584  624  5587 0

c  -1-1 --> -2
c    ( b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧  b^{2, 312}_0 ∧ -p_624) -> ( b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0)
c  in CNF:
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨  b^{2, 313}_2
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨  b^{2, 313}_1
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨  p_624 ∨ -b^{2, 313}_0
c  in DIMACS:
-5582  5583 -5584  624  5585 0
-5582  5583 -5584  624  5586 0
-5582  5583 -5584  624 -5587 0

c  -2-1 --> break 
c    ( b^{2, 312}_2 ∧  b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨  b^{2, 312}_0 ∨  p_624 ∨ break
c  in DIMACS:
-5582 -5583  5584  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 312}_2 ∧ -b^{2, 312}_1 ∧ -b^{2, 312}_0 ∧ true) 
c  in CNF:
c    -b^{2, 312}_2 ∨  b^{2, 312}_1 ∨  b^{2, 312}_0 ∨ false 
c  in DIMACS:
-5582  5583  5584  0

c  3 does not represent an automaton state.
c    -(-b^{2, 312}_2 ∧  b^{2, 312}_1 ∧  b^{2, 312}_0 ∧ true) 
c  in CNF:
c     b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ false 
c  in DIMACS:
 5582 -5583 -5584  0
c  -3 does not represent an automaton state.
c    -( b^{2, 312}_2 ∧  b^{2, 312}_1 ∧  b^{2, 312}_0 ∧ true) 
c  in CNF:
c    -b^{2, 312}_2 ∨ -b^{2, 312}_1 ∨ -b^{2, 312}_0 ∨ false 
c  in DIMACS:
-5582 -5583 -5584  0

c i = 313
c  -2+1 --> -1
c    ( b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧  p_626) -> ( b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0)
c  in CNF:
c    -b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨  b^{2, 314}_2
c    -b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_1
c    -b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨  b^{2, 314}_0
c  in DIMACS:
-5585 -5586  5587 -626  5588 0
-5585 -5586  5587 -626 -5589 0
-5585 -5586  5587 -626  5590 0

c  -1+1 --> 0
c    ( b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0 ∧  p_626) -> (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧ -b^{2, 314}_0)
c  in CNF:
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_2
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_1
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_0
c  in DIMACS:
-5585  5586 -5587 -626 -5588 0
-5585  5586 -5587 -626 -5589 0
-5585  5586 -5587 -626 -5590 0

c  0+1 --> 1
c    (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧  p_626) -> (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0)
c  in CNF:
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_2
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_1
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨  b^{2, 314}_0
c  in DIMACS:
 5585  5586  5587 -626 -5588 0
 5585  5586  5587 -626 -5589 0
 5585  5586  5587 -626  5590 0

c  1+1 --> 2
c    (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0 ∧  p_626) -> (-b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0)
c  in CNF:
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_2
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨  b^{2, 314}_1
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ -p_626 ∨ -b^{2, 314}_0
c  in DIMACS:
 5585  5586 -5587 -626 -5588 0
 5585  5586 -5587 -626  5589 0
 5585  5586 -5587 -626 -5590 0

c  2+1 --> break 
c    (-b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧  p_626) -> break
c  in CNF:
c     b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ -p_626 ∨ break
c  in DIMACS:
 5585 -5586  5587 -626 1162 0


c  2-1 --> 1
c    (-b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧ -p_626) -> (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0)
c  in CNF:
c     b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_2
c     b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_1
c     b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨  b^{2, 314}_0
c  in DIMACS:
 5585 -5586  5587  626 -5588 0
 5585 -5586  5587  626 -5589 0
 5585 -5586  5587  626  5590 0

c  1-1 --> 0
c    (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0 ∧ -p_626) -> (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧ -b^{2, 314}_0)
c  in CNF:
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_2
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_1
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_0
c  in DIMACS:
 5585  5586 -5587  626 -5588 0
 5585  5586 -5587  626 -5589 0
 5585  5586 -5587  626 -5590 0

c  0-1 --> -1
c    (-b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧ -p_626) -> ( b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0)
c  in CNF:
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨  b^{2, 314}_2
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_1
c     b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨  b^{2, 314}_0
c  in DIMACS:
 5585  5586  5587  626  5588 0
 5585  5586  5587  626 -5589 0
 5585  5586  5587  626  5590 0

c  -1-1 --> -2
c    ( b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧  b^{2, 313}_0 ∧ -p_626) -> ( b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0)
c  in CNF:
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨  b^{2, 314}_2
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨  b^{2, 314}_1
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨  p_626 ∨ -b^{2, 314}_0
c  in DIMACS:
-5585  5586 -5587  626  5588 0
-5585  5586 -5587  626  5589 0
-5585  5586 -5587  626 -5590 0

c  -2-1 --> break 
c    ( b^{2, 313}_2 ∧  b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧ -p_626) -> break
c  in CNF:
c    -b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨  b^{2, 313}_0 ∨  p_626 ∨ break
c  in DIMACS:
-5585 -5586  5587  626 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 313}_2 ∧ -b^{2, 313}_1 ∧ -b^{2, 313}_0 ∧ true) 
c  in CNF:
c    -b^{2, 313}_2 ∨  b^{2, 313}_1 ∨  b^{2, 313}_0 ∨ false 
c  in DIMACS:
-5585  5586  5587  0

c  3 does not represent an automaton state.
c    -(-b^{2, 313}_2 ∧  b^{2, 313}_1 ∧  b^{2, 313}_0 ∧ true) 
c  in CNF:
c     b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ false 
c  in DIMACS:
 5585 -5586 -5587  0
c  -3 does not represent an automaton state.
c    -( b^{2, 313}_2 ∧  b^{2, 313}_1 ∧  b^{2, 313}_0 ∧ true) 
c  in CNF:
c    -b^{2, 313}_2 ∨ -b^{2, 313}_1 ∨ -b^{2, 313}_0 ∨ false 
c  in DIMACS:
-5585 -5586 -5587  0

c i = 314
c  -2+1 --> -1
c    ( b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧  p_628) -> ( b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0)
c  in CNF:
c    -b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨  b^{2, 315}_2
c    -b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_1
c    -b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨  b^{2, 315}_0
c  in DIMACS:
-5588 -5589  5590 -628  5591 0
-5588 -5589  5590 -628 -5592 0
-5588 -5589  5590 -628  5593 0

c  -1+1 --> 0
c    ( b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0 ∧  p_628) -> (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧ -b^{2, 315}_0)
c  in CNF:
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_2
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_1
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_0
c  in DIMACS:
-5588  5589 -5590 -628 -5591 0
-5588  5589 -5590 -628 -5592 0
-5588  5589 -5590 -628 -5593 0

c  0+1 --> 1
c    (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧  p_628) -> (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0)
c  in CNF:
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_2
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_1
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨  b^{2, 315}_0
c  in DIMACS:
 5588  5589  5590 -628 -5591 0
 5588  5589  5590 -628 -5592 0
 5588  5589  5590 -628  5593 0

c  1+1 --> 2
c    (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0 ∧  p_628) -> (-b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0)
c  in CNF:
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_2
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨  b^{2, 315}_1
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ -p_628 ∨ -b^{2, 315}_0
c  in DIMACS:
 5588  5589 -5590 -628 -5591 0
 5588  5589 -5590 -628  5592 0
 5588  5589 -5590 -628 -5593 0

c  2+1 --> break 
c    (-b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧  p_628) -> break
c  in CNF:
c     b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ -p_628 ∨ break
c  in DIMACS:
 5588 -5589  5590 -628 1162 0


c  2-1 --> 1
c    (-b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧ -p_628) -> (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0)
c  in CNF:
c     b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_2
c     b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_1
c     b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨  b^{2, 315}_0
c  in DIMACS:
 5588 -5589  5590  628 -5591 0
 5588 -5589  5590  628 -5592 0
 5588 -5589  5590  628  5593 0

c  1-1 --> 0
c    (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0 ∧ -p_628) -> (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧ -b^{2, 315}_0)
c  in CNF:
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_2
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_1
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_0
c  in DIMACS:
 5588  5589 -5590  628 -5591 0
 5588  5589 -5590  628 -5592 0
 5588  5589 -5590  628 -5593 0

c  0-1 --> -1
c    (-b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧ -p_628) -> ( b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0)
c  in CNF:
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨  b^{2, 315}_2
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_1
c     b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨  b^{2, 315}_0
c  in DIMACS:
 5588  5589  5590  628  5591 0
 5588  5589  5590  628 -5592 0
 5588  5589  5590  628  5593 0

c  -1-1 --> -2
c    ( b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧  b^{2, 314}_0 ∧ -p_628) -> ( b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0)
c  in CNF:
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨  b^{2, 315}_2
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨  b^{2, 315}_1
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨  p_628 ∨ -b^{2, 315}_0
c  in DIMACS:
-5588  5589 -5590  628  5591 0
-5588  5589 -5590  628  5592 0
-5588  5589 -5590  628 -5593 0

c  -2-1 --> break 
c    ( b^{2, 314}_2 ∧  b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧ -p_628) -> break
c  in CNF:
c    -b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨  b^{2, 314}_0 ∨  p_628 ∨ break
c  in DIMACS:
-5588 -5589  5590  628 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 314}_2 ∧ -b^{2, 314}_1 ∧ -b^{2, 314}_0 ∧ true) 
c  in CNF:
c    -b^{2, 314}_2 ∨  b^{2, 314}_1 ∨  b^{2, 314}_0 ∨ false 
c  in DIMACS:
-5588  5589  5590  0

c  3 does not represent an automaton state.
c    -(-b^{2, 314}_2 ∧  b^{2, 314}_1 ∧  b^{2, 314}_0 ∧ true) 
c  in CNF:
c     b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ false 
c  in DIMACS:
 5588 -5589 -5590  0
c  -3 does not represent an automaton state.
c    -( b^{2, 314}_2 ∧  b^{2, 314}_1 ∧  b^{2, 314}_0 ∧ true) 
c  in CNF:
c    -b^{2, 314}_2 ∨ -b^{2, 314}_1 ∨ -b^{2, 314}_0 ∨ false 
c  in DIMACS:
-5588 -5589 -5590  0

c i = 315
c  -2+1 --> -1
c    ( b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧  p_630) -> ( b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0)
c  in CNF:
c    -b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨  b^{2, 316}_2
c    -b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_1
c    -b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨  b^{2, 316}_0
c  in DIMACS:
-5591 -5592  5593 -630  5594 0
-5591 -5592  5593 -630 -5595 0
-5591 -5592  5593 -630  5596 0

c  -1+1 --> 0
c    ( b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0 ∧  p_630) -> (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧ -b^{2, 316}_0)
c  in CNF:
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_2
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_1
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_0
c  in DIMACS:
-5591  5592 -5593 -630 -5594 0
-5591  5592 -5593 -630 -5595 0
-5591  5592 -5593 -630 -5596 0

c  0+1 --> 1
c    (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧  p_630) -> (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0)
c  in CNF:
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_2
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_1
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨  b^{2, 316}_0
c  in DIMACS:
 5591  5592  5593 -630 -5594 0
 5591  5592  5593 -630 -5595 0
 5591  5592  5593 -630  5596 0

c  1+1 --> 2
c    (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0 ∧  p_630) -> (-b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0)
c  in CNF:
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_2
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨  b^{2, 316}_1
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ -p_630 ∨ -b^{2, 316}_0
c  in DIMACS:
 5591  5592 -5593 -630 -5594 0
 5591  5592 -5593 -630  5595 0
 5591  5592 -5593 -630 -5596 0

c  2+1 --> break 
c    (-b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧  p_630) -> break
c  in CNF:
c     b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 5591 -5592  5593 -630 1162 0


c  2-1 --> 1
c    (-b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧ -p_630) -> (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0)
c  in CNF:
c     b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_2
c     b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_1
c     b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨  b^{2, 316}_0
c  in DIMACS:
 5591 -5592  5593  630 -5594 0
 5591 -5592  5593  630 -5595 0
 5591 -5592  5593  630  5596 0

c  1-1 --> 0
c    (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0 ∧ -p_630) -> (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧ -b^{2, 316}_0)
c  in CNF:
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_2
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_1
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_0
c  in DIMACS:
 5591  5592 -5593  630 -5594 0
 5591  5592 -5593  630 -5595 0
 5591  5592 -5593  630 -5596 0

c  0-1 --> -1
c    (-b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧ -p_630) -> ( b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0)
c  in CNF:
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨  b^{2, 316}_2
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_1
c     b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨  b^{2, 316}_0
c  in DIMACS:
 5591  5592  5593  630  5594 0
 5591  5592  5593  630 -5595 0
 5591  5592  5593  630  5596 0

c  -1-1 --> -2
c    ( b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧  b^{2, 315}_0 ∧ -p_630) -> ( b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0)
c  in CNF:
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨  b^{2, 316}_2
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨  b^{2, 316}_1
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨  p_630 ∨ -b^{2, 316}_0
c  in DIMACS:
-5591  5592 -5593  630  5594 0
-5591  5592 -5593  630  5595 0
-5591  5592 -5593  630 -5596 0

c  -2-1 --> break 
c    ( b^{2, 315}_2 ∧  b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨  b^{2, 315}_0 ∨  p_630 ∨ break
c  in DIMACS:
-5591 -5592  5593  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 315}_2 ∧ -b^{2, 315}_1 ∧ -b^{2, 315}_0 ∧ true) 
c  in CNF:
c    -b^{2, 315}_2 ∨  b^{2, 315}_1 ∨  b^{2, 315}_0 ∨ false 
c  in DIMACS:
-5591  5592  5593  0

c  3 does not represent an automaton state.
c    -(-b^{2, 315}_2 ∧  b^{2, 315}_1 ∧  b^{2, 315}_0 ∧ true) 
c  in CNF:
c     b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ false 
c  in DIMACS:
 5591 -5592 -5593  0
c  -3 does not represent an automaton state.
c    -( b^{2, 315}_2 ∧  b^{2, 315}_1 ∧  b^{2, 315}_0 ∧ true) 
c  in CNF:
c    -b^{2, 315}_2 ∨ -b^{2, 315}_1 ∨ -b^{2, 315}_0 ∨ false 
c  in DIMACS:
-5591 -5592 -5593  0

c i = 316
c  -2+1 --> -1
c    ( b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧  p_632) -> ( b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0)
c  in CNF:
c    -b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨  b^{2, 317}_2
c    -b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_1
c    -b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨  b^{2, 317}_0
c  in DIMACS:
-5594 -5595  5596 -632  5597 0
-5594 -5595  5596 -632 -5598 0
-5594 -5595  5596 -632  5599 0

c  -1+1 --> 0
c    ( b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0 ∧  p_632) -> (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧ -b^{2, 317}_0)
c  in CNF:
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_2
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_1
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_0
c  in DIMACS:
-5594  5595 -5596 -632 -5597 0
-5594  5595 -5596 -632 -5598 0
-5594  5595 -5596 -632 -5599 0

c  0+1 --> 1
c    (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧  p_632) -> (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0)
c  in CNF:
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_2
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_1
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨  b^{2, 317}_0
c  in DIMACS:
 5594  5595  5596 -632 -5597 0
 5594  5595  5596 -632 -5598 0
 5594  5595  5596 -632  5599 0

c  1+1 --> 2
c    (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0 ∧  p_632) -> (-b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0)
c  in CNF:
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_2
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨  b^{2, 317}_1
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ -p_632 ∨ -b^{2, 317}_0
c  in DIMACS:
 5594  5595 -5596 -632 -5597 0
 5594  5595 -5596 -632  5598 0
 5594  5595 -5596 -632 -5599 0

c  2+1 --> break 
c    (-b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧  p_632) -> break
c  in CNF:
c     b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 5594 -5595  5596 -632 1162 0


c  2-1 --> 1
c    (-b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧ -p_632) -> (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0)
c  in CNF:
c     b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_2
c     b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_1
c     b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨  b^{2, 317}_0
c  in DIMACS:
 5594 -5595  5596  632 -5597 0
 5594 -5595  5596  632 -5598 0
 5594 -5595  5596  632  5599 0

c  1-1 --> 0
c    (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0 ∧ -p_632) -> (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧ -b^{2, 317}_0)
c  in CNF:
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_2
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_1
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_0
c  in DIMACS:
 5594  5595 -5596  632 -5597 0
 5594  5595 -5596  632 -5598 0
 5594  5595 -5596  632 -5599 0

c  0-1 --> -1
c    (-b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧ -p_632) -> ( b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0)
c  in CNF:
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨  b^{2, 317}_2
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_1
c     b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨  b^{2, 317}_0
c  in DIMACS:
 5594  5595  5596  632  5597 0
 5594  5595  5596  632 -5598 0
 5594  5595  5596  632  5599 0

c  -1-1 --> -2
c    ( b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧  b^{2, 316}_0 ∧ -p_632) -> ( b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0)
c  in CNF:
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨  b^{2, 317}_2
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨  b^{2, 317}_1
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨  p_632 ∨ -b^{2, 317}_0
c  in DIMACS:
-5594  5595 -5596  632  5597 0
-5594  5595 -5596  632  5598 0
-5594  5595 -5596  632 -5599 0

c  -2-1 --> break 
c    ( b^{2, 316}_2 ∧  b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨  b^{2, 316}_0 ∨  p_632 ∨ break
c  in DIMACS:
-5594 -5595  5596  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 316}_2 ∧ -b^{2, 316}_1 ∧ -b^{2, 316}_0 ∧ true) 
c  in CNF:
c    -b^{2, 316}_2 ∨  b^{2, 316}_1 ∨  b^{2, 316}_0 ∨ false 
c  in DIMACS:
-5594  5595  5596  0

c  3 does not represent an automaton state.
c    -(-b^{2, 316}_2 ∧  b^{2, 316}_1 ∧  b^{2, 316}_0 ∧ true) 
c  in CNF:
c     b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ false 
c  in DIMACS:
 5594 -5595 -5596  0
c  -3 does not represent an automaton state.
c    -( b^{2, 316}_2 ∧  b^{2, 316}_1 ∧  b^{2, 316}_0 ∧ true) 
c  in CNF:
c    -b^{2, 316}_2 ∨ -b^{2, 316}_1 ∨ -b^{2, 316}_0 ∨ false 
c  in DIMACS:
-5594 -5595 -5596  0

c i = 317
c  -2+1 --> -1
c    ( b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧  p_634) -> ( b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0)
c  in CNF:
c    -b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨  b^{2, 318}_2
c    -b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_1
c    -b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨  b^{2, 318}_0
c  in DIMACS:
-5597 -5598  5599 -634  5600 0
-5597 -5598  5599 -634 -5601 0
-5597 -5598  5599 -634  5602 0

c  -1+1 --> 0
c    ( b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0 ∧  p_634) -> (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧ -b^{2, 318}_0)
c  in CNF:
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_2
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_1
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_0
c  in DIMACS:
-5597  5598 -5599 -634 -5600 0
-5597  5598 -5599 -634 -5601 0
-5597  5598 -5599 -634 -5602 0

c  0+1 --> 1
c    (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧  p_634) -> (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0)
c  in CNF:
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_2
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_1
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨  b^{2, 318}_0
c  in DIMACS:
 5597  5598  5599 -634 -5600 0
 5597  5598  5599 -634 -5601 0
 5597  5598  5599 -634  5602 0

c  1+1 --> 2
c    (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0 ∧  p_634) -> (-b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0)
c  in CNF:
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_2
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨  b^{2, 318}_1
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ -p_634 ∨ -b^{2, 318}_0
c  in DIMACS:
 5597  5598 -5599 -634 -5600 0
 5597  5598 -5599 -634  5601 0
 5597  5598 -5599 -634 -5602 0

c  2+1 --> break 
c    (-b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧  p_634) -> break
c  in CNF:
c     b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ -p_634 ∨ break
c  in DIMACS:
 5597 -5598  5599 -634 1162 0


c  2-1 --> 1
c    (-b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧ -p_634) -> (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0)
c  in CNF:
c     b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_2
c     b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_1
c     b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨  b^{2, 318}_0
c  in DIMACS:
 5597 -5598  5599  634 -5600 0
 5597 -5598  5599  634 -5601 0
 5597 -5598  5599  634  5602 0

c  1-1 --> 0
c    (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0 ∧ -p_634) -> (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧ -b^{2, 318}_0)
c  in CNF:
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_2
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_1
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_0
c  in DIMACS:
 5597  5598 -5599  634 -5600 0
 5597  5598 -5599  634 -5601 0
 5597  5598 -5599  634 -5602 0

c  0-1 --> -1
c    (-b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧ -p_634) -> ( b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0)
c  in CNF:
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨  b^{2, 318}_2
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_1
c     b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨  b^{2, 318}_0
c  in DIMACS:
 5597  5598  5599  634  5600 0
 5597  5598  5599  634 -5601 0
 5597  5598  5599  634  5602 0

c  -1-1 --> -2
c    ( b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧  b^{2, 317}_0 ∧ -p_634) -> ( b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0)
c  in CNF:
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨  b^{2, 318}_2
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨  b^{2, 318}_1
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨  p_634 ∨ -b^{2, 318}_0
c  in DIMACS:
-5597  5598 -5599  634  5600 0
-5597  5598 -5599  634  5601 0
-5597  5598 -5599  634 -5602 0

c  -2-1 --> break 
c    ( b^{2, 317}_2 ∧  b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧ -p_634) -> break
c  in CNF:
c    -b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨  b^{2, 317}_0 ∨  p_634 ∨ break
c  in DIMACS:
-5597 -5598  5599  634 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 317}_2 ∧ -b^{2, 317}_1 ∧ -b^{2, 317}_0 ∧ true) 
c  in CNF:
c    -b^{2, 317}_2 ∨  b^{2, 317}_1 ∨  b^{2, 317}_0 ∨ false 
c  in DIMACS:
-5597  5598  5599  0

c  3 does not represent an automaton state.
c    -(-b^{2, 317}_2 ∧  b^{2, 317}_1 ∧  b^{2, 317}_0 ∧ true) 
c  in CNF:
c     b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ false 
c  in DIMACS:
 5597 -5598 -5599  0
c  -3 does not represent an automaton state.
c    -( b^{2, 317}_2 ∧  b^{2, 317}_1 ∧  b^{2, 317}_0 ∧ true) 
c  in CNF:
c    -b^{2, 317}_2 ∨ -b^{2, 317}_1 ∨ -b^{2, 317}_0 ∨ false 
c  in DIMACS:
-5597 -5598 -5599  0

c i = 318
c  -2+1 --> -1
c    ( b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧  p_636) -> ( b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0)
c  in CNF:
c    -b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨  b^{2, 319}_2
c    -b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_1
c    -b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨  b^{2, 319}_0
c  in DIMACS:
-5600 -5601  5602 -636  5603 0
-5600 -5601  5602 -636 -5604 0
-5600 -5601  5602 -636  5605 0

c  -1+1 --> 0
c    ( b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0 ∧  p_636) -> (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧ -b^{2, 319}_0)
c  in CNF:
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_2
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_1
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_0
c  in DIMACS:
-5600  5601 -5602 -636 -5603 0
-5600  5601 -5602 -636 -5604 0
-5600  5601 -5602 -636 -5605 0

c  0+1 --> 1
c    (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧  p_636) -> (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0)
c  in CNF:
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_2
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_1
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨  b^{2, 319}_0
c  in DIMACS:
 5600  5601  5602 -636 -5603 0
 5600  5601  5602 -636 -5604 0
 5600  5601  5602 -636  5605 0

c  1+1 --> 2
c    (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0 ∧  p_636) -> (-b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0)
c  in CNF:
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_2
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨  b^{2, 319}_1
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ -p_636 ∨ -b^{2, 319}_0
c  in DIMACS:
 5600  5601 -5602 -636 -5603 0
 5600  5601 -5602 -636  5604 0
 5600  5601 -5602 -636 -5605 0

c  2+1 --> break 
c    (-b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧  p_636) -> break
c  in CNF:
c     b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 5600 -5601  5602 -636 1162 0


c  2-1 --> 1
c    (-b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧ -p_636) -> (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0)
c  in CNF:
c     b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_2
c     b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_1
c     b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨  b^{2, 319}_0
c  in DIMACS:
 5600 -5601  5602  636 -5603 0
 5600 -5601  5602  636 -5604 0
 5600 -5601  5602  636  5605 0

c  1-1 --> 0
c    (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0 ∧ -p_636) -> (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧ -b^{2, 319}_0)
c  in CNF:
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_2
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_1
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_0
c  in DIMACS:
 5600  5601 -5602  636 -5603 0
 5600  5601 -5602  636 -5604 0
 5600  5601 -5602  636 -5605 0

c  0-1 --> -1
c    (-b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧ -p_636) -> ( b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0)
c  in CNF:
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨  b^{2, 319}_2
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_1
c     b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨  b^{2, 319}_0
c  in DIMACS:
 5600  5601  5602  636  5603 0
 5600  5601  5602  636 -5604 0
 5600  5601  5602  636  5605 0

c  -1-1 --> -2
c    ( b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧  b^{2, 318}_0 ∧ -p_636) -> ( b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0)
c  in CNF:
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨  b^{2, 319}_2
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨  b^{2, 319}_1
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨  p_636 ∨ -b^{2, 319}_0
c  in DIMACS:
-5600  5601 -5602  636  5603 0
-5600  5601 -5602  636  5604 0
-5600  5601 -5602  636 -5605 0

c  -2-1 --> break 
c    ( b^{2, 318}_2 ∧  b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨  b^{2, 318}_0 ∨  p_636 ∨ break
c  in DIMACS:
-5600 -5601  5602  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 318}_2 ∧ -b^{2, 318}_1 ∧ -b^{2, 318}_0 ∧ true) 
c  in CNF:
c    -b^{2, 318}_2 ∨  b^{2, 318}_1 ∨  b^{2, 318}_0 ∨ false 
c  in DIMACS:
-5600  5601  5602  0

c  3 does not represent an automaton state.
c    -(-b^{2, 318}_2 ∧  b^{2, 318}_1 ∧  b^{2, 318}_0 ∧ true) 
c  in CNF:
c     b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ false 
c  in DIMACS:
 5600 -5601 -5602  0
c  -3 does not represent an automaton state.
c    -( b^{2, 318}_2 ∧  b^{2, 318}_1 ∧  b^{2, 318}_0 ∧ true) 
c  in CNF:
c    -b^{2, 318}_2 ∨ -b^{2, 318}_1 ∨ -b^{2, 318}_0 ∨ false 
c  in DIMACS:
-5600 -5601 -5602  0

c i = 319
c  -2+1 --> -1
c    ( b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧  p_638) -> ( b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0)
c  in CNF:
c    -b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨  b^{2, 320}_2
c    -b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_1
c    -b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨  b^{2, 320}_0
c  in DIMACS:
-5603 -5604  5605 -638  5606 0
-5603 -5604  5605 -638 -5607 0
-5603 -5604  5605 -638  5608 0

c  -1+1 --> 0
c    ( b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0 ∧  p_638) -> (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧ -b^{2, 320}_0)
c  in CNF:
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_2
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_1
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_0
c  in DIMACS:
-5603  5604 -5605 -638 -5606 0
-5603  5604 -5605 -638 -5607 0
-5603  5604 -5605 -638 -5608 0

c  0+1 --> 1
c    (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧  p_638) -> (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0)
c  in CNF:
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_2
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_1
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨  b^{2, 320}_0
c  in DIMACS:
 5603  5604  5605 -638 -5606 0
 5603  5604  5605 -638 -5607 0
 5603  5604  5605 -638  5608 0

c  1+1 --> 2
c    (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0 ∧  p_638) -> (-b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0)
c  in CNF:
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_2
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨  b^{2, 320}_1
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ -p_638 ∨ -b^{2, 320}_0
c  in DIMACS:
 5603  5604 -5605 -638 -5606 0
 5603  5604 -5605 -638  5607 0
 5603  5604 -5605 -638 -5608 0

c  2+1 --> break 
c    (-b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧  p_638) -> break
c  in CNF:
c     b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 5603 -5604  5605 -638 1162 0


c  2-1 --> 1
c    (-b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧ -p_638) -> (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0)
c  in CNF:
c     b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_2
c     b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_1
c     b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨  b^{2, 320}_0
c  in DIMACS:
 5603 -5604  5605  638 -5606 0
 5603 -5604  5605  638 -5607 0
 5603 -5604  5605  638  5608 0

c  1-1 --> 0
c    (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0 ∧ -p_638) -> (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧ -b^{2, 320}_0)
c  in CNF:
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_2
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_1
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_0
c  in DIMACS:
 5603  5604 -5605  638 -5606 0
 5603  5604 -5605  638 -5607 0
 5603  5604 -5605  638 -5608 0

c  0-1 --> -1
c    (-b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧ -p_638) -> ( b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0)
c  in CNF:
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨  b^{2, 320}_2
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_1
c     b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨  b^{2, 320}_0
c  in DIMACS:
 5603  5604  5605  638  5606 0
 5603  5604  5605  638 -5607 0
 5603  5604  5605  638  5608 0

c  -1-1 --> -2
c    ( b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧  b^{2, 319}_0 ∧ -p_638) -> ( b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0)
c  in CNF:
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨  b^{2, 320}_2
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨  b^{2, 320}_1
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨  p_638 ∨ -b^{2, 320}_0
c  in DIMACS:
-5603  5604 -5605  638  5606 0
-5603  5604 -5605  638  5607 0
-5603  5604 -5605  638 -5608 0

c  -2-1 --> break 
c    ( b^{2, 319}_2 ∧  b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨  b^{2, 319}_0 ∨  p_638 ∨ break
c  in DIMACS:
-5603 -5604  5605  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 319}_2 ∧ -b^{2, 319}_1 ∧ -b^{2, 319}_0 ∧ true) 
c  in CNF:
c    -b^{2, 319}_2 ∨  b^{2, 319}_1 ∨  b^{2, 319}_0 ∨ false 
c  in DIMACS:
-5603  5604  5605  0

c  3 does not represent an automaton state.
c    -(-b^{2, 319}_2 ∧  b^{2, 319}_1 ∧  b^{2, 319}_0 ∧ true) 
c  in CNF:
c     b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ false 
c  in DIMACS:
 5603 -5604 -5605  0
c  -3 does not represent an automaton state.
c    -( b^{2, 319}_2 ∧  b^{2, 319}_1 ∧  b^{2, 319}_0 ∧ true) 
c  in CNF:
c    -b^{2, 319}_2 ∨ -b^{2, 319}_1 ∨ -b^{2, 319}_0 ∨ false 
c  in DIMACS:
-5603 -5604 -5605  0

c i = 320
c  -2+1 --> -1
c    ( b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧  p_640) -> ( b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0)
c  in CNF:
c    -b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨  b^{2, 321}_2
c    -b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_1
c    -b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨  b^{2, 321}_0
c  in DIMACS:
-5606 -5607  5608 -640  5609 0
-5606 -5607  5608 -640 -5610 0
-5606 -5607  5608 -640  5611 0

c  -1+1 --> 0
c    ( b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0 ∧  p_640) -> (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧ -b^{2, 321}_0)
c  in CNF:
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_2
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_1
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_0
c  in DIMACS:
-5606  5607 -5608 -640 -5609 0
-5606  5607 -5608 -640 -5610 0
-5606  5607 -5608 -640 -5611 0

c  0+1 --> 1
c    (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧  p_640) -> (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0)
c  in CNF:
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_2
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_1
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨  b^{2, 321}_0
c  in DIMACS:
 5606  5607  5608 -640 -5609 0
 5606  5607  5608 -640 -5610 0
 5606  5607  5608 -640  5611 0

c  1+1 --> 2
c    (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0 ∧  p_640) -> (-b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0)
c  in CNF:
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_2
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨  b^{2, 321}_1
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ -p_640 ∨ -b^{2, 321}_0
c  in DIMACS:
 5606  5607 -5608 -640 -5609 0
 5606  5607 -5608 -640  5610 0
 5606  5607 -5608 -640 -5611 0

c  2+1 --> break 
c    (-b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧  p_640) -> break
c  in CNF:
c     b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 5606 -5607  5608 -640 1162 0


c  2-1 --> 1
c    (-b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧ -p_640) -> (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0)
c  in CNF:
c     b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_2
c     b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_1
c     b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨  b^{2, 321}_0
c  in DIMACS:
 5606 -5607  5608  640 -5609 0
 5606 -5607  5608  640 -5610 0
 5606 -5607  5608  640  5611 0

c  1-1 --> 0
c    (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0 ∧ -p_640) -> (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧ -b^{2, 321}_0)
c  in CNF:
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_2
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_1
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_0
c  in DIMACS:
 5606  5607 -5608  640 -5609 0
 5606  5607 -5608  640 -5610 0
 5606  5607 -5608  640 -5611 0

c  0-1 --> -1
c    (-b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧ -p_640) -> ( b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0)
c  in CNF:
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨  b^{2, 321}_2
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_1
c     b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨  b^{2, 321}_0
c  in DIMACS:
 5606  5607  5608  640  5609 0
 5606  5607  5608  640 -5610 0
 5606  5607  5608  640  5611 0

c  -1-1 --> -2
c    ( b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧  b^{2, 320}_0 ∧ -p_640) -> ( b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0)
c  in CNF:
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨  b^{2, 321}_2
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨  b^{2, 321}_1
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨  p_640 ∨ -b^{2, 321}_0
c  in DIMACS:
-5606  5607 -5608  640  5609 0
-5606  5607 -5608  640  5610 0
-5606  5607 -5608  640 -5611 0

c  -2-1 --> break 
c    ( b^{2, 320}_2 ∧  b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨  b^{2, 320}_0 ∨  p_640 ∨ break
c  in DIMACS:
-5606 -5607  5608  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 320}_2 ∧ -b^{2, 320}_1 ∧ -b^{2, 320}_0 ∧ true) 
c  in CNF:
c    -b^{2, 320}_2 ∨  b^{2, 320}_1 ∨  b^{2, 320}_0 ∨ false 
c  in DIMACS:
-5606  5607  5608  0

c  3 does not represent an automaton state.
c    -(-b^{2, 320}_2 ∧  b^{2, 320}_1 ∧  b^{2, 320}_0 ∧ true) 
c  in CNF:
c     b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ false 
c  in DIMACS:
 5606 -5607 -5608  0
c  -3 does not represent an automaton state.
c    -( b^{2, 320}_2 ∧  b^{2, 320}_1 ∧  b^{2, 320}_0 ∧ true) 
c  in CNF:
c    -b^{2, 320}_2 ∨ -b^{2, 320}_1 ∨ -b^{2, 320}_0 ∨ false 
c  in DIMACS:
-5606 -5607 -5608  0

c i = 321
c  -2+1 --> -1
c    ( b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧  p_642) -> ( b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0)
c  in CNF:
c    -b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨  b^{2, 322}_2
c    -b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_1
c    -b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨  b^{2, 322}_0
c  in DIMACS:
-5609 -5610  5611 -642  5612 0
-5609 -5610  5611 -642 -5613 0
-5609 -5610  5611 -642  5614 0

c  -1+1 --> 0
c    ( b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0 ∧  p_642) -> (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧ -b^{2, 322}_0)
c  in CNF:
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_2
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_1
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_0
c  in DIMACS:
-5609  5610 -5611 -642 -5612 0
-5609  5610 -5611 -642 -5613 0
-5609  5610 -5611 -642 -5614 0

c  0+1 --> 1
c    (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧  p_642) -> (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0)
c  in CNF:
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_2
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_1
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨  b^{2, 322}_0
c  in DIMACS:
 5609  5610  5611 -642 -5612 0
 5609  5610  5611 -642 -5613 0
 5609  5610  5611 -642  5614 0

c  1+1 --> 2
c    (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0 ∧  p_642) -> (-b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0)
c  in CNF:
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_2
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨  b^{2, 322}_1
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ -p_642 ∨ -b^{2, 322}_0
c  in DIMACS:
 5609  5610 -5611 -642 -5612 0
 5609  5610 -5611 -642  5613 0
 5609  5610 -5611 -642 -5614 0

c  2+1 --> break 
c    (-b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧  p_642) -> break
c  in CNF:
c     b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 5609 -5610  5611 -642 1162 0


c  2-1 --> 1
c    (-b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧ -p_642) -> (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0)
c  in CNF:
c     b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_2
c     b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_1
c     b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨  b^{2, 322}_0
c  in DIMACS:
 5609 -5610  5611  642 -5612 0
 5609 -5610  5611  642 -5613 0
 5609 -5610  5611  642  5614 0

c  1-1 --> 0
c    (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0 ∧ -p_642) -> (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧ -b^{2, 322}_0)
c  in CNF:
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_2
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_1
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_0
c  in DIMACS:
 5609  5610 -5611  642 -5612 0
 5609  5610 -5611  642 -5613 0
 5609  5610 -5611  642 -5614 0

c  0-1 --> -1
c    (-b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧ -p_642) -> ( b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0)
c  in CNF:
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨  b^{2, 322}_2
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_1
c     b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨  b^{2, 322}_0
c  in DIMACS:
 5609  5610  5611  642  5612 0
 5609  5610  5611  642 -5613 0
 5609  5610  5611  642  5614 0

c  -1-1 --> -2
c    ( b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧  b^{2, 321}_0 ∧ -p_642) -> ( b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0)
c  in CNF:
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨  b^{2, 322}_2
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨  b^{2, 322}_1
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨  p_642 ∨ -b^{2, 322}_0
c  in DIMACS:
-5609  5610 -5611  642  5612 0
-5609  5610 -5611  642  5613 0
-5609  5610 -5611  642 -5614 0

c  -2-1 --> break 
c    ( b^{2, 321}_2 ∧  b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨  b^{2, 321}_0 ∨  p_642 ∨ break
c  in DIMACS:
-5609 -5610  5611  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 321}_2 ∧ -b^{2, 321}_1 ∧ -b^{2, 321}_0 ∧ true) 
c  in CNF:
c    -b^{2, 321}_2 ∨  b^{2, 321}_1 ∨  b^{2, 321}_0 ∨ false 
c  in DIMACS:
-5609  5610  5611  0

c  3 does not represent an automaton state.
c    -(-b^{2, 321}_2 ∧  b^{2, 321}_1 ∧  b^{2, 321}_0 ∧ true) 
c  in CNF:
c     b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ false 
c  in DIMACS:
 5609 -5610 -5611  0
c  -3 does not represent an automaton state.
c    -( b^{2, 321}_2 ∧  b^{2, 321}_1 ∧  b^{2, 321}_0 ∧ true) 
c  in CNF:
c    -b^{2, 321}_2 ∨ -b^{2, 321}_1 ∨ -b^{2, 321}_0 ∨ false 
c  in DIMACS:
-5609 -5610 -5611  0

c i = 322
c  -2+1 --> -1
c    ( b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧  p_644) -> ( b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0)
c  in CNF:
c    -b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨  b^{2, 323}_2
c    -b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_1
c    -b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨  b^{2, 323}_0
c  in DIMACS:
-5612 -5613  5614 -644  5615 0
-5612 -5613  5614 -644 -5616 0
-5612 -5613  5614 -644  5617 0

c  -1+1 --> 0
c    ( b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0 ∧  p_644) -> (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧ -b^{2, 323}_0)
c  in CNF:
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_2
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_1
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_0
c  in DIMACS:
-5612  5613 -5614 -644 -5615 0
-5612  5613 -5614 -644 -5616 0
-5612  5613 -5614 -644 -5617 0

c  0+1 --> 1
c    (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧  p_644) -> (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0)
c  in CNF:
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_2
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_1
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨  b^{2, 323}_0
c  in DIMACS:
 5612  5613  5614 -644 -5615 0
 5612  5613  5614 -644 -5616 0
 5612  5613  5614 -644  5617 0

c  1+1 --> 2
c    (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0 ∧  p_644) -> (-b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0)
c  in CNF:
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_2
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨  b^{2, 323}_1
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ -p_644 ∨ -b^{2, 323}_0
c  in DIMACS:
 5612  5613 -5614 -644 -5615 0
 5612  5613 -5614 -644  5616 0
 5612  5613 -5614 -644 -5617 0

c  2+1 --> break 
c    (-b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧  p_644) -> break
c  in CNF:
c     b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 5612 -5613  5614 -644 1162 0


c  2-1 --> 1
c    (-b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧ -p_644) -> (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0)
c  in CNF:
c     b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_2
c     b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_1
c     b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨  b^{2, 323}_0
c  in DIMACS:
 5612 -5613  5614  644 -5615 0
 5612 -5613  5614  644 -5616 0
 5612 -5613  5614  644  5617 0

c  1-1 --> 0
c    (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0 ∧ -p_644) -> (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧ -b^{2, 323}_0)
c  in CNF:
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_2
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_1
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_0
c  in DIMACS:
 5612  5613 -5614  644 -5615 0
 5612  5613 -5614  644 -5616 0
 5612  5613 -5614  644 -5617 0

c  0-1 --> -1
c    (-b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧ -p_644) -> ( b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0)
c  in CNF:
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨  b^{2, 323}_2
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_1
c     b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨  b^{2, 323}_0
c  in DIMACS:
 5612  5613  5614  644  5615 0
 5612  5613  5614  644 -5616 0
 5612  5613  5614  644  5617 0

c  -1-1 --> -2
c    ( b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧  b^{2, 322}_0 ∧ -p_644) -> ( b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0)
c  in CNF:
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨  b^{2, 323}_2
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨  b^{2, 323}_1
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨  p_644 ∨ -b^{2, 323}_0
c  in DIMACS:
-5612  5613 -5614  644  5615 0
-5612  5613 -5614  644  5616 0
-5612  5613 -5614  644 -5617 0

c  -2-1 --> break 
c    ( b^{2, 322}_2 ∧  b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨  b^{2, 322}_0 ∨  p_644 ∨ break
c  in DIMACS:
-5612 -5613  5614  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 322}_2 ∧ -b^{2, 322}_1 ∧ -b^{2, 322}_0 ∧ true) 
c  in CNF:
c    -b^{2, 322}_2 ∨  b^{2, 322}_1 ∨  b^{2, 322}_0 ∨ false 
c  in DIMACS:
-5612  5613  5614  0

c  3 does not represent an automaton state.
c    -(-b^{2, 322}_2 ∧  b^{2, 322}_1 ∧  b^{2, 322}_0 ∧ true) 
c  in CNF:
c     b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ false 
c  in DIMACS:
 5612 -5613 -5614  0
c  -3 does not represent an automaton state.
c    -( b^{2, 322}_2 ∧  b^{2, 322}_1 ∧  b^{2, 322}_0 ∧ true) 
c  in CNF:
c    -b^{2, 322}_2 ∨ -b^{2, 322}_1 ∨ -b^{2, 322}_0 ∨ false 
c  in DIMACS:
-5612 -5613 -5614  0

c i = 323
c  -2+1 --> -1
c    ( b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧  p_646) -> ( b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0)
c  in CNF:
c    -b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨  b^{2, 324}_2
c    -b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_1
c    -b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨  b^{2, 324}_0
c  in DIMACS:
-5615 -5616  5617 -646  5618 0
-5615 -5616  5617 -646 -5619 0
-5615 -5616  5617 -646  5620 0

c  -1+1 --> 0
c    ( b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0 ∧  p_646) -> (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧ -b^{2, 324}_0)
c  in CNF:
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_2
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_1
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_0
c  in DIMACS:
-5615  5616 -5617 -646 -5618 0
-5615  5616 -5617 -646 -5619 0
-5615  5616 -5617 -646 -5620 0

c  0+1 --> 1
c    (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧  p_646) -> (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0)
c  in CNF:
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_2
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_1
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨  b^{2, 324}_0
c  in DIMACS:
 5615  5616  5617 -646 -5618 0
 5615  5616  5617 -646 -5619 0
 5615  5616  5617 -646  5620 0

c  1+1 --> 2
c    (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0 ∧  p_646) -> (-b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0)
c  in CNF:
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_2
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨  b^{2, 324}_1
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ -p_646 ∨ -b^{2, 324}_0
c  in DIMACS:
 5615  5616 -5617 -646 -5618 0
 5615  5616 -5617 -646  5619 0
 5615  5616 -5617 -646 -5620 0

c  2+1 --> break 
c    (-b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧  p_646) -> break
c  in CNF:
c     b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 5615 -5616  5617 -646 1162 0


c  2-1 --> 1
c    (-b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧ -p_646) -> (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0)
c  in CNF:
c     b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_2
c     b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_1
c     b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨  b^{2, 324}_0
c  in DIMACS:
 5615 -5616  5617  646 -5618 0
 5615 -5616  5617  646 -5619 0
 5615 -5616  5617  646  5620 0

c  1-1 --> 0
c    (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0 ∧ -p_646) -> (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧ -b^{2, 324}_0)
c  in CNF:
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_2
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_1
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_0
c  in DIMACS:
 5615  5616 -5617  646 -5618 0
 5615  5616 -5617  646 -5619 0
 5615  5616 -5617  646 -5620 0

c  0-1 --> -1
c    (-b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧ -p_646) -> ( b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0)
c  in CNF:
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨  b^{2, 324}_2
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_1
c     b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨  b^{2, 324}_0
c  in DIMACS:
 5615  5616  5617  646  5618 0
 5615  5616  5617  646 -5619 0
 5615  5616  5617  646  5620 0

c  -1-1 --> -2
c    ( b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧  b^{2, 323}_0 ∧ -p_646) -> ( b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0)
c  in CNF:
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨  b^{2, 324}_2
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨  b^{2, 324}_1
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨  p_646 ∨ -b^{2, 324}_0
c  in DIMACS:
-5615  5616 -5617  646  5618 0
-5615  5616 -5617  646  5619 0
-5615  5616 -5617  646 -5620 0

c  -2-1 --> break 
c    ( b^{2, 323}_2 ∧  b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨  b^{2, 323}_0 ∨  p_646 ∨ break
c  in DIMACS:
-5615 -5616  5617  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 323}_2 ∧ -b^{2, 323}_1 ∧ -b^{2, 323}_0 ∧ true) 
c  in CNF:
c    -b^{2, 323}_2 ∨  b^{2, 323}_1 ∨  b^{2, 323}_0 ∨ false 
c  in DIMACS:
-5615  5616  5617  0

c  3 does not represent an automaton state.
c    -(-b^{2, 323}_2 ∧  b^{2, 323}_1 ∧  b^{2, 323}_0 ∧ true) 
c  in CNF:
c     b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ false 
c  in DIMACS:
 5615 -5616 -5617  0
c  -3 does not represent an automaton state.
c    -( b^{2, 323}_2 ∧  b^{2, 323}_1 ∧  b^{2, 323}_0 ∧ true) 
c  in CNF:
c    -b^{2, 323}_2 ∨ -b^{2, 323}_1 ∨ -b^{2, 323}_0 ∨ false 
c  in DIMACS:
-5615 -5616 -5617  0

c i = 324
c  -2+1 --> -1
c    ( b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧  p_648) -> ( b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0)
c  in CNF:
c    -b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨  b^{2, 325}_2
c    -b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_1
c    -b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨  b^{2, 325}_0
c  in DIMACS:
-5618 -5619  5620 -648  5621 0
-5618 -5619  5620 -648 -5622 0
-5618 -5619  5620 -648  5623 0

c  -1+1 --> 0
c    ( b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0 ∧  p_648) -> (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧ -b^{2, 325}_0)
c  in CNF:
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_2
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_1
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_0
c  in DIMACS:
-5618  5619 -5620 -648 -5621 0
-5618  5619 -5620 -648 -5622 0
-5618  5619 -5620 -648 -5623 0

c  0+1 --> 1
c    (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧  p_648) -> (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0)
c  in CNF:
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_2
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_1
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨  b^{2, 325}_0
c  in DIMACS:
 5618  5619  5620 -648 -5621 0
 5618  5619  5620 -648 -5622 0
 5618  5619  5620 -648  5623 0

c  1+1 --> 2
c    (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0 ∧  p_648) -> (-b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0)
c  in CNF:
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_2
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨  b^{2, 325}_1
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ -p_648 ∨ -b^{2, 325}_0
c  in DIMACS:
 5618  5619 -5620 -648 -5621 0
 5618  5619 -5620 -648  5622 0
 5618  5619 -5620 -648 -5623 0

c  2+1 --> break 
c    (-b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧  p_648) -> break
c  in CNF:
c     b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 5618 -5619  5620 -648 1162 0


c  2-1 --> 1
c    (-b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧ -p_648) -> (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0)
c  in CNF:
c     b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_2
c     b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_1
c     b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨  b^{2, 325}_0
c  in DIMACS:
 5618 -5619  5620  648 -5621 0
 5618 -5619  5620  648 -5622 0
 5618 -5619  5620  648  5623 0

c  1-1 --> 0
c    (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0 ∧ -p_648) -> (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧ -b^{2, 325}_0)
c  in CNF:
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_2
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_1
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_0
c  in DIMACS:
 5618  5619 -5620  648 -5621 0
 5618  5619 -5620  648 -5622 0
 5618  5619 -5620  648 -5623 0

c  0-1 --> -1
c    (-b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧ -p_648) -> ( b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0)
c  in CNF:
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨  b^{2, 325}_2
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_1
c     b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨  b^{2, 325}_0
c  in DIMACS:
 5618  5619  5620  648  5621 0
 5618  5619  5620  648 -5622 0
 5618  5619  5620  648  5623 0

c  -1-1 --> -2
c    ( b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧  b^{2, 324}_0 ∧ -p_648) -> ( b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0)
c  in CNF:
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨  b^{2, 325}_2
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨  b^{2, 325}_1
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨  p_648 ∨ -b^{2, 325}_0
c  in DIMACS:
-5618  5619 -5620  648  5621 0
-5618  5619 -5620  648  5622 0
-5618  5619 -5620  648 -5623 0

c  -2-1 --> break 
c    ( b^{2, 324}_2 ∧  b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨  b^{2, 324}_0 ∨  p_648 ∨ break
c  in DIMACS:
-5618 -5619  5620  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 324}_2 ∧ -b^{2, 324}_1 ∧ -b^{2, 324}_0 ∧ true) 
c  in CNF:
c    -b^{2, 324}_2 ∨  b^{2, 324}_1 ∨  b^{2, 324}_0 ∨ false 
c  in DIMACS:
-5618  5619  5620  0

c  3 does not represent an automaton state.
c    -(-b^{2, 324}_2 ∧  b^{2, 324}_1 ∧  b^{2, 324}_0 ∧ true) 
c  in CNF:
c     b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ false 
c  in DIMACS:
 5618 -5619 -5620  0
c  -3 does not represent an automaton state.
c    -( b^{2, 324}_2 ∧  b^{2, 324}_1 ∧  b^{2, 324}_0 ∧ true) 
c  in CNF:
c    -b^{2, 324}_2 ∨ -b^{2, 324}_1 ∨ -b^{2, 324}_0 ∨ false 
c  in DIMACS:
-5618 -5619 -5620  0

c i = 325
c  -2+1 --> -1
c    ( b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧  p_650) -> ( b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0)
c  in CNF:
c    -b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨  b^{2, 326}_2
c    -b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_1
c    -b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨  b^{2, 326}_0
c  in DIMACS:
-5621 -5622  5623 -650  5624 0
-5621 -5622  5623 -650 -5625 0
-5621 -5622  5623 -650  5626 0

c  -1+1 --> 0
c    ( b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0 ∧  p_650) -> (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧ -b^{2, 326}_0)
c  in CNF:
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_2
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_1
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_0
c  in DIMACS:
-5621  5622 -5623 -650 -5624 0
-5621  5622 -5623 -650 -5625 0
-5621  5622 -5623 -650 -5626 0

c  0+1 --> 1
c    (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧  p_650) -> (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0)
c  in CNF:
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_2
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_1
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨  b^{2, 326}_0
c  in DIMACS:
 5621  5622  5623 -650 -5624 0
 5621  5622  5623 -650 -5625 0
 5621  5622  5623 -650  5626 0

c  1+1 --> 2
c    (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0 ∧  p_650) -> (-b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0)
c  in CNF:
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_2
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨  b^{2, 326}_1
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ -p_650 ∨ -b^{2, 326}_0
c  in DIMACS:
 5621  5622 -5623 -650 -5624 0
 5621  5622 -5623 -650  5625 0
 5621  5622 -5623 -650 -5626 0

c  2+1 --> break 
c    (-b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧  p_650) -> break
c  in CNF:
c     b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 5621 -5622  5623 -650 1162 0


c  2-1 --> 1
c    (-b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧ -p_650) -> (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0)
c  in CNF:
c     b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_2
c     b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_1
c     b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨  b^{2, 326}_0
c  in DIMACS:
 5621 -5622  5623  650 -5624 0
 5621 -5622  5623  650 -5625 0
 5621 -5622  5623  650  5626 0

c  1-1 --> 0
c    (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0 ∧ -p_650) -> (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧ -b^{2, 326}_0)
c  in CNF:
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_2
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_1
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_0
c  in DIMACS:
 5621  5622 -5623  650 -5624 0
 5621  5622 -5623  650 -5625 0
 5621  5622 -5623  650 -5626 0

c  0-1 --> -1
c    (-b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧ -p_650) -> ( b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0)
c  in CNF:
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨  b^{2, 326}_2
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_1
c     b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨  b^{2, 326}_0
c  in DIMACS:
 5621  5622  5623  650  5624 0
 5621  5622  5623  650 -5625 0
 5621  5622  5623  650  5626 0

c  -1-1 --> -2
c    ( b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧  b^{2, 325}_0 ∧ -p_650) -> ( b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0)
c  in CNF:
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨  b^{2, 326}_2
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨  b^{2, 326}_1
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨  p_650 ∨ -b^{2, 326}_0
c  in DIMACS:
-5621  5622 -5623  650  5624 0
-5621  5622 -5623  650  5625 0
-5621  5622 -5623  650 -5626 0

c  -2-1 --> break 
c    ( b^{2, 325}_2 ∧  b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨  b^{2, 325}_0 ∨  p_650 ∨ break
c  in DIMACS:
-5621 -5622  5623  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 325}_2 ∧ -b^{2, 325}_1 ∧ -b^{2, 325}_0 ∧ true) 
c  in CNF:
c    -b^{2, 325}_2 ∨  b^{2, 325}_1 ∨  b^{2, 325}_0 ∨ false 
c  in DIMACS:
-5621  5622  5623  0

c  3 does not represent an automaton state.
c    -(-b^{2, 325}_2 ∧  b^{2, 325}_1 ∧  b^{2, 325}_0 ∧ true) 
c  in CNF:
c     b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ false 
c  in DIMACS:
 5621 -5622 -5623  0
c  -3 does not represent an automaton state.
c    -( b^{2, 325}_2 ∧  b^{2, 325}_1 ∧  b^{2, 325}_0 ∧ true) 
c  in CNF:
c    -b^{2, 325}_2 ∨ -b^{2, 325}_1 ∨ -b^{2, 325}_0 ∨ false 
c  in DIMACS:
-5621 -5622 -5623  0

c i = 326
c  -2+1 --> -1
c    ( b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧  p_652) -> ( b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0)
c  in CNF:
c    -b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨  b^{2, 327}_2
c    -b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_1
c    -b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨  b^{2, 327}_0
c  in DIMACS:
-5624 -5625  5626 -652  5627 0
-5624 -5625  5626 -652 -5628 0
-5624 -5625  5626 -652  5629 0

c  -1+1 --> 0
c    ( b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0 ∧  p_652) -> (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧ -b^{2, 327}_0)
c  in CNF:
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_2
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_1
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_0
c  in DIMACS:
-5624  5625 -5626 -652 -5627 0
-5624  5625 -5626 -652 -5628 0
-5624  5625 -5626 -652 -5629 0

c  0+1 --> 1
c    (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧  p_652) -> (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0)
c  in CNF:
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_2
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_1
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨  b^{2, 327}_0
c  in DIMACS:
 5624  5625  5626 -652 -5627 0
 5624  5625  5626 -652 -5628 0
 5624  5625  5626 -652  5629 0

c  1+1 --> 2
c    (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0 ∧  p_652) -> (-b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0)
c  in CNF:
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_2
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨  b^{2, 327}_1
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ -p_652 ∨ -b^{2, 327}_0
c  in DIMACS:
 5624  5625 -5626 -652 -5627 0
 5624  5625 -5626 -652  5628 0
 5624  5625 -5626 -652 -5629 0

c  2+1 --> break 
c    (-b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧  p_652) -> break
c  in CNF:
c     b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ -p_652 ∨ break
c  in DIMACS:
 5624 -5625  5626 -652 1162 0


c  2-1 --> 1
c    (-b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧ -p_652) -> (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0)
c  in CNF:
c     b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_2
c     b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_1
c     b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨  b^{2, 327}_0
c  in DIMACS:
 5624 -5625  5626  652 -5627 0
 5624 -5625  5626  652 -5628 0
 5624 -5625  5626  652  5629 0

c  1-1 --> 0
c    (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0 ∧ -p_652) -> (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧ -b^{2, 327}_0)
c  in CNF:
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_2
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_1
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_0
c  in DIMACS:
 5624  5625 -5626  652 -5627 0
 5624  5625 -5626  652 -5628 0
 5624  5625 -5626  652 -5629 0

c  0-1 --> -1
c    (-b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧ -p_652) -> ( b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0)
c  in CNF:
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨  b^{2, 327}_2
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_1
c     b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨  b^{2, 327}_0
c  in DIMACS:
 5624  5625  5626  652  5627 0
 5624  5625  5626  652 -5628 0
 5624  5625  5626  652  5629 0

c  -1-1 --> -2
c    ( b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧  b^{2, 326}_0 ∧ -p_652) -> ( b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0)
c  in CNF:
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨  b^{2, 327}_2
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨  b^{2, 327}_1
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨  p_652 ∨ -b^{2, 327}_0
c  in DIMACS:
-5624  5625 -5626  652  5627 0
-5624  5625 -5626  652  5628 0
-5624  5625 -5626  652 -5629 0

c  -2-1 --> break 
c    ( b^{2, 326}_2 ∧  b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧ -p_652) -> break
c  in CNF:
c    -b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨  b^{2, 326}_0 ∨  p_652 ∨ break
c  in DIMACS:
-5624 -5625  5626  652 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 326}_2 ∧ -b^{2, 326}_1 ∧ -b^{2, 326}_0 ∧ true) 
c  in CNF:
c    -b^{2, 326}_2 ∨  b^{2, 326}_1 ∨  b^{2, 326}_0 ∨ false 
c  in DIMACS:
-5624  5625  5626  0

c  3 does not represent an automaton state.
c    -(-b^{2, 326}_2 ∧  b^{2, 326}_1 ∧  b^{2, 326}_0 ∧ true) 
c  in CNF:
c     b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ false 
c  in DIMACS:
 5624 -5625 -5626  0
c  -3 does not represent an automaton state.
c    -( b^{2, 326}_2 ∧  b^{2, 326}_1 ∧  b^{2, 326}_0 ∧ true) 
c  in CNF:
c    -b^{2, 326}_2 ∨ -b^{2, 326}_1 ∨ -b^{2, 326}_0 ∨ false 
c  in DIMACS:
-5624 -5625 -5626  0

c i = 327
c  -2+1 --> -1
c    ( b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧  p_654) -> ( b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0)
c  in CNF:
c    -b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨  b^{2, 328}_2
c    -b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_1
c    -b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨  b^{2, 328}_0
c  in DIMACS:
-5627 -5628  5629 -654  5630 0
-5627 -5628  5629 -654 -5631 0
-5627 -5628  5629 -654  5632 0

c  -1+1 --> 0
c    ( b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0 ∧  p_654) -> (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧ -b^{2, 328}_0)
c  in CNF:
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_2
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_1
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_0
c  in DIMACS:
-5627  5628 -5629 -654 -5630 0
-5627  5628 -5629 -654 -5631 0
-5627  5628 -5629 -654 -5632 0

c  0+1 --> 1
c    (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧  p_654) -> (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0)
c  in CNF:
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_2
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_1
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨  b^{2, 328}_0
c  in DIMACS:
 5627  5628  5629 -654 -5630 0
 5627  5628  5629 -654 -5631 0
 5627  5628  5629 -654  5632 0

c  1+1 --> 2
c    (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0 ∧  p_654) -> (-b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0)
c  in CNF:
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_2
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨  b^{2, 328}_1
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ -p_654 ∨ -b^{2, 328}_0
c  in DIMACS:
 5627  5628 -5629 -654 -5630 0
 5627  5628 -5629 -654  5631 0
 5627  5628 -5629 -654 -5632 0

c  2+1 --> break 
c    (-b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧  p_654) -> break
c  in CNF:
c     b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 5627 -5628  5629 -654 1162 0


c  2-1 --> 1
c    (-b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧ -p_654) -> (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0)
c  in CNF:
c     b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_2
c     b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_1
c     b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨  b^{2, 328}_0
c  in DIMACS:
 5627 -5628  5629  654 -5630 0
 5627 -5628  5629  654 -5631 0
 5627 -5628  5629  654  5632 0

c  1-1 --> 0
c    (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0 ∧ -p_654) -> (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧ -b^{2, 328}_0)
c  in CNF:
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_2
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_1
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_0
c  in DIMACS:
 5627  5628 -5629  654 -5630 0
 5627  5628 -5629  654 -5631 0
 5627  5628 -5629  654 -5632 0

c  0-1 --> -1
c    (-b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧ -p_654) -> ( b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0)
c  in CNF:
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨  b^{2, 328}_2
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_1
c     b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨  b^{2, 328}_0
c  in DIMACS:
 5627  5628  5629  654  5630 0
 5627  5628  5629  654 -5631 0
 5627  5628  5629  654  5632 0

c  -1-1 --> -2
c    ( b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧  b^{2, 327}_0 ∧ -p_654) -> ( b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0)
c  in CNF:
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨  b^{2, 328}_2
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨  b^{2, 328}_1
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨  p_654 ∨ -b^{2, 328}_0
c  in DIMACS:
-5627  5628 -5629  654  5630 0
-5627  5628 -5629  654  5631 0
-5627  5628 -5629  654 -5632 0

c  -2-1 --> break 
c    ( b^{2, 327}_2 ∧  b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨  b^{2, 327}_0 ∨  p_654 ∨ break
c  in DIMACS:
-5627 -5628  5629  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 327}_2 ∧ -b^{2, 327}_1 ∧ -b^{2, 327}_0 ∧ true) 
c  in CNF:
c    -b^{2, 327}_2 ∨  b^{2, 327}_1 ∨  b^{2, 327}_0 ∨ false 
c  in DIMACS:
-5627  5628  5629  0

c  3 does not represent an automaton state.
c    -(-b^{2, 327}_2 ∧  b^{2, 327}_1 ∧  b^{2, 327}_0 ∧ true) 
c  in CNF:
c     b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ false 
c  in DIMACS:
 5627 -5628 -5629  0
c  -3 does not represent an automaton state.
c    -( b^{2, 327}_2 ∧  b^{2, 327}_1 ∧  b^{2, 327}_0 ∧ true) 
c  in CNF:
c    -b^{2, 327}_2 ∨ -b^{2, 327}_1 ∨ -b^{2, 327}_0 ∨ false 
c  in DIMACS:
-5627 -5628 -5629  0

c i = 328
c  -2+1 --> -1
c    ( b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧  p_656) -> ( b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0)
c  in CNF:
c    -b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨  b^{2, 329}_2
c    -b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_1
c    -b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨  b^{2, 329}_0
c  in DIMACS:
-5630 -5631  5632 -656  5633 0
-5630 -5631  5632 -656 -5634 0
-5630 -5631  5632 -656  5635 0

c  -1+1 --> 0
c    ( b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0 ∧  p_656) -> (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧ -b^{2, 329}_0)
c  in CNF:
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_2
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_1
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_0
c  in DIMACS:
-5630  5631 -5632 -656 -5633 0
-5630  5631 -5632 -656 -5634 0
-5630  5631 -5632 -656 -5635 0

c  0+1 --> 1
c    (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧  p_656) -> (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0)
c  in CNF:
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_2
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_1
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨  b^{2, 329}_0
c  in DIMACS:
 5630  5631  5632 -656 -5633 0
 5630  5631  5632 -656 -5634 0
 5630  5631  5632 -656  5635 0

c  1+1 --> 2
c    (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0 ∧  p_656) -> (-b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0)
c  in CNF:
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_2
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨  b^{2, 329}_1
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ -p_656 ∨ -b^{2, 329}_0
c  in DIMACS:
 5630  5631 -5632 -656 -5633 0
 5630  5631 -5632 -656  5634 0
 5630  5631 -5632 -656 -5635 0

c  2+1 --> break 
c    (-b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧  p_656) -> break
c  in CNF:
c     b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 5630 -5631  5632 -656 1162 0


c  2-1 --> 1
c    (-b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧ -p_656) -> (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0)
c  in CNF:
c     b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_2
c     b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_1
c     b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨  b^{2, 329}_0
c  in DIMACS:
 5630 -5631  5632  656 -5633 0
 5630 -5631  5632  656 -5634 0
 5630 -5631  5632  656  5635 0

c  1-1 --> 0
c    (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0 ∧ -p_656) -> (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧ -b^{2, 329}_0)
c  in CNF:
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_2
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_1
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_0
c  in DIMACS:
 5630  5631 -5632  656 -5633 0
 5630  5631 -5632  656 -5634 0
 5630  5631 -5632  656 -5635 0

c  0-1 --> -1
c    (-b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧ -p_656) -> ( b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0)
c  in CNF:
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨  b^{2, 329}_2
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_1
c     b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨  b^{2, 329}_0
c  in DIMACS:
 5630  5631  5632  656  5633 0
 5630  5631  5632  656 -5634 0
 5630  5631  5632  656  5635 0

c  -1-1 --> -2
c    ( b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧  b^{2, 328}_0 ∧ -p_656) -> ( b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0)
c  in CNF:
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨  b^{2, 329}_2
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨  b^{2, 329}_1
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨  p_656 ∨ -b^{2, 329}_0
c  in DIMACS:
-5630  5631 -5632  656  5633 0
-5630  5631 -5632  656  5634 0
-5630  5631 -5632  656 -5635 0

c  -2-1 --> break 
c    ( b^{2, 328}_2 ∧  b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨  b^{2, 328}_0 ∨  p_656 ∨ break
c  in DIMACS:
-5630 -5631  5632  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 328}_2 ∧ -b^{2, 328}_1 ∧ -b^{2, 328}_0 ∧ true) 
c  in CNF:
c    -b^{2, 328}_2 ∨  b^{2, 328}_1 ∨  b^{2, 328}_0 ∨ false 
c  in DIMACS:
-5630  5631  5632  0

c  3 does not represent an automaton state.
c    -(-b^{2, 328}_2 ∧  b^{2, 328}_1 ∧  b^{2, 328}_0 ∧ true) 
c  in CNF:
c     b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ false 
c  in DIMACS:
 5630 -5631 -5632  0
c  -3 does not represent an automaton state.
c    -( b^{2, 328}_2 ∧  b^{2, 328}_1 ∧  b^{2, 328}_0 ∧ true) 
c  in CNF:
c    -b^{2, 328}_2 ∨ -b^{2, 328}_1 ∨ -b^{2, 328}_0 ∨ false 
c  in DIMACS:
-5630 -5631 -5632  0

c i = 329
c  -2+1 --> -1
c    ( b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧  p_658) -> ( b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0)
c  in CNF:
c    -b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨  b^{2, 330}_2
c    -b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_1
c    -b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨  b^{2, 330}_0
c  in DIMACS:
-5633 -5634  5635 -658  5636 0
-5633 -5634  5635 -658 -5637 0
-5633 -5634  5635 -658  5638 0

c  -1+1 --> 0
c    ( b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0 ∧  p_658) -> (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧ -b^{2, 330}_0)
c  in CNF:
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_2
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_1
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_0
c  in DIMACS:
-5633  5634 -5635 -658 -5636 0
-5633  5634 -5635 -658 -5637 0
-5633  5634 -5635 -658 -5638 0

c  0+1 --> 1
c    (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧  p_658) -> (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0)
c  in CNF:
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_2
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_1
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨  b^{2, 330}_0
c  in DIMACS:
 5633  5634  5635 -658 -5636 0
 5633  5634  5635 -658 -5637 0
 5633  5634  5635 -658  5638 0

c  1+1 --> 2
c    (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0 ∧  p_658) -> (-b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0)
c  in CNF:
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_2
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨  b^{2, 330}_1
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ -p_658 ∨ -b^{2, 330}_0
c  in DIMACS:
 5633  5634 -5635 -658 -5636 0
 5633  5634 -5635 -658  5637 0
 5633  5634 -5635 -658 -5638 0

c  2+1 --> break 
c    (-b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧  p_658) -> break
c  in CNF:
c     b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 5633 -5634  5635 -658 1162 0


c  2-1 --> 1
c    (-b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧ -p_658) -> (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0)
c  in CNF:
c     b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_2
c     b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_1
c     b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨  b^{2, 330}_0
c  in DIMACS:
 5633 -5634  5635  658 -5636 0
 5633 -5634  5635  658 -5637 0
 5633 -5634  5635  658  5638 0

c  1-1 --> 0
c    (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0 ∧ -p_658) -> (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧ -b^{2, 330}_0)
c  in CNF:
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_2
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_1
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_0
c  in DIMACS:
 5633  5634 -5635  658 -5636 0
 5633  5634 -5635  658 -5637 0
 5633  5634 -5635  658 -5638 0

c  0-1 --> -1
c    (-b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧ -p_658) -> ( b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0)
c  in CNF:
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨  b^{2, 330}_2
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_1
c     b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨  b^{2, 330}_0
c  in DIMACS:
 5633  5634  5635  658  5636 0
 5633  5634  5635  658 -5637 0
 5633  5634  5635  658  5638 0

c  -1-1 --> -2
c    ( b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧  b^{2, 329}_0 ∧ -p_658) -> ( b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0)
c  in CNF:
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨  b^{2, 330}_2
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨  b^{2, 330}_1
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨  p_658 ∨ -b^{2, 330}_0
c  in DIMACS:
-5633  5634 -5635  658  5636 0
-5633  5634 -5635  658  5637 0
-5633  5634 -5635  658 -5638 0

c  -2-1 --> break 
c    ( b^{2, 329}_2 ∧  b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨  b^{2, 329}_0 ∨  p_658 ∨ break
c  in DIMACS:
-5633 -5634  5635  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 329}_2 ∧ -b^{2, 329}_1 ∧ -b^{2, 329}_0 ∧ true) 
c  in CNF:
c    -b^{2, 329}_2 ∨  b^{2, 329}_1 ∨  b^{2, 329}_0 ∨ false 
c  in DIMACS:
-5633  5634  5635  0

c  3 does not represent an automaton state.
c    -(-b^{2, 329}_2 ∧  b^{2, 329}_1 ∧  b^{2, 329}_0 ∧ true) 
c  in CNF:
c     b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ false 
c  in DIMACS:
 5633 -5634 -5635  0
c  -3 does not represent an automaton state.
c    -( b^{2, 329}_2 ∧  b^{2, 329}_1 ∧  b^{2, 329}_0 ∧ true) 
c  in CNF:
c    -b^{2, 329}_2 ∨ -b^{2, 329}_1 ∨ -b^{2, 329}_0 ∨ false 
c  in DIMACS:
-5633 -5634 -5635  0

c i = 330
c  -2+1 --> -1
c    ( b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧  p_660) -> ( b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0)
c  in CNF:
c    -b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨  b^{2, 331}_2
c    -b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_1
c    -b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨  b^{2, 331}_0
c  in DIMACS:
-5636 -5637  5638 -660  5639 0
-5636 -5637  5638 -660 -5640 0
-5636 -5637  5638 -660  5641 0

c  -1+1 --> 0
c    ( b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0 ∧  p_660) -> (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧ -b^{2, 331}_0)
c  in CNF:
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_2
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_1
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_0
c  in DIMACS:
-5636  5637 -5638 -660 -5639 0
-5636  5637 -5638 -660 -5640 0
-5636  5637 -5638 -660 -5641 0

c  0+1 --> 1
c    (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧  p_660) -> (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0)
c  in CNF:
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_2
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_1
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨  b^{2, 331}_0
c  in DIMACS:
 5636  5637  5638 -660 -5639 0
 5636  5637  5638 -660 -5640 0
 5636  5637  5638 -660  5641 0

c  1+1 --> 2
c    (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0 ∧  p_660) -> (-b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0)
c  in CNF:
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_2
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨  b^{2, 331}_1
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ -p_660 ∨ -b^{2, 331}_0
c  in DIMACS:
 5636  5637 -5638 -660 -5639 0
 5636  5637 -5638 -660  5640 0
 5636  5637 -5638 -660 -5641 0

c  2+1 --> break 
c    (-b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧  p_660) -> break
c  in CNF:
c     b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 5636 -5637  5638 -660 1162 0


c  2-1 --> 1
c    (-b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧ -p_660) -> (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0)
c  in CNF:
c     b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_2
c     b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_1
c     b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨  b^{2, 331}_0
c  in DIMACS:
 5636 -5637  5638  660 -5639 0
 5636 -5637  5638  660 -5640 0
 5636 -5637  5638  660  5641 0

c  1-1 --> 0
c    (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0 ∧ -p_660) -> (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧ -b^{2, 331}_0)
c  in CNF:
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_2
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_1
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_0
c  in DIMACS:
 5636  5637 -5638  660 -5639 0
 5636  5637 -5638  660 -5640 0
 5636  5637 -5638  660 -5641 0

c  0-1 --> -1
c    (-b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧ -p_660) -> ( b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0)
c  in CNF:
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨  b^{2, 331}_2
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_1
c     b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨  b^{2, 331}_0
c  in DIMACS:
 5636  5637  5638  660  5639 0
 5636  5637  5638  660 -5640 0
 5636  5637  5638  660  5641 0

c  -1-1 --> -2
c    ( b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧  b^{2, 330}_0 ∧ -p_660) -> ( b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0)
c  in CNF:
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨  b^{2, 331}_2
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨  b^{2, 331}_1
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨  p_660 ∨ -b^{2, 331}_0
c  in DIMACS:
-5636  5637 -5638  660  5639 0
-5636  5637 -5638  660  5640 0
-5636  5637 -5638  660 -5641 0

c  -2-1 --> break 
c    ( b^{2, 330}_2 ∧  b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨  b^{2, 330}_0 ∨  p_660 ∨ break
c  in DIMACS:
-5636 -5637  5638  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 330}_2 ∧ -b^{2, 330}_1 ∧ -b^{2, 330}_0 ∧ true) 
c  in CNF:
c    -b^{2, 330}_2 ∨  b^{2, 330}_1 ∨  b^{2, 330}_0 ∨ false 
c  in DIMACS:
-5636  5637  5638  0

c  3 does not represent an automaton state.
c    -(-b^{2, 330}_2 ∧  b^{2, 330}_1 ∧  b^{2, 330}_0 ∧ true) 
c  in CNF:
c     b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ false 
c  in DIMACS:
 5636 -5637 -5638  0
c  -3 does not represent an automaton state.
c    -( b^{2, 330}_2 ∧  b^{2, 330}_1 ∧  b^{2, 330}_0 ∧ true) 
c  in CNF:
c    -b^{2, 330}_2 ∨ -b^{2, 330}_1 ∨ -b^{2, 330}_0 ∨ false 
c  in DIMACS:
-5636 -5637 -5638  0

c i = 331
c  -2+1 --> -1
c    ( b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧  p_662) -> ( b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0)
c  in CNF:
c    -b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨  b^{2, 332}_2
c    -b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_1
c    -b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨  b^{2, 332}_0
c  in DIMACS:
-5639 -5640  5641 -662  5642 0
-5639 -5640  5641 -662 -5643 0
-5639 -5640  5641 -662  5644 0

c  -1+1 --> 0
c    ( b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0 ∧  p_662) -> (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧ -b^{2, 332}_0)
c  in CNF:
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_2
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_1
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_0
c  in DIMACS:
-5639  5640 -5641 -662 -5642 0
-5639  5640 -5641 -662 -5643 0
-5639  5640 -5641 -662 -5644 0

c  0+1 --> 1
c    (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧  p_662) -> (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0)
c  in CNF:
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_2
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_1
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨  b^{2, 332}_0
c  in DIMACS:
 5639  5640  5641 -662 -5642 0
 5639  5640  5641 -662 -5643 0
 5639  5640  5641 -662  5644 0

c  1+1 --> 2
c    (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0 ∧  p_662) -> (-b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0)
c  in CNF:
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_2
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨  b^{2, 332}_1
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ -p_662 ∨ -b^{2, 332}_0
c  in DIMACS:
 5639  5640 -5641 -662 -5642 0
 5639  5640 -5641 -662  5643 0
 5639  5640 -5641 -662 -5644 0

c  2+1 --> break 
c    (-b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧  p_662) -> break
c  in CNF:
c     b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ -p_662 ∨ break
c  in DIMACS:
 5639 -5640  5641 -662 1162 0


c  2-1 --> 1
c    (-b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧ -p_662) -> (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0)
c  in CNF:
c     b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_2
c     b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_1
c     b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨  b^{2, 332}_0
c  in DIMACS:
 5639 -5640  5641  662 -5642 0
 5639 -5640  5641  662 -5643 0
 5639 -5640  5641  662  5644 0

c  1-1 --> 0
c    (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0 ∧ -p_662) -> (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧ -b^{2, 332}_0)
c  in CNF:
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_2
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_1
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_0
c  in DIMACS:
 5639  5640 -5641  662 -5642 0
 5639  5640 -5641  662 -5643 0
 5639  5640 -5641  662 -5644 0

c  0-1 --> -1
c    (-b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧ -p_662) -> ( b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0)
c  in CNF:
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨  b^{2, 332}_2
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_1
c     b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨  b^{2, 332}_0
c  in DIMACS:
 5639  5640  5641  662  5642 0
 5639  5640  5641  662 -5643 0
 5639  5640  5641  662  5644 0

c  -1-1 --> -2
c    ( b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧  b^{2, 331}_0 ∧ -p_662) -> ( b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0)
c  in CNF:
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨  b^{2, 332}_2
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨  b^{2, 332}_1
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨  p_662 ∨ -b^{2, 332}_0
c  in DIMACS:
-5639  5640 -5641  662  5642 0
-5639  5640 -5641  662  5643 0
-5639  5640 -5641  662 -5644 0

c  -2-1 --> break 
c    ( b^{2, 331}_2 ∧  b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧ -p_662) -> break
c  in CNF:
c    -b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨  b^{2, 331}_0 ∨  p_662 ∨ break
c  in DIMACS:
-5639 -5640  5641  662 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 331}_2 ∧ -b^{2, 331}_1 ∧ -b^{2, 331}_0 ∧ true) 
c  in CNF:
c    -b^{2, 331}_2 ∨  b^{2, 331}_1 ∨  b^{2, 331}_0 ∨ false 
c  in DIMACS:
-5639  5640  5641  0

c  3 does not represent an automaton state.
c    -(-b^{2, 331}_2 ∧  b^{2, 331}_1 ∧  b^{2, 331}_0 ∧ true) 
c  in CNF:
c     b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ false 
c  in DIMACS:
 5639 -5640 -5641  0
c  -3 does not represent an automaton state.
c    -( b^{2, 331}_2 ∧  b^{2, 331}_1 ∧  b^{2, 331}_0 ∧ true) 
c  in CNF:
c    -b^{2, 331}_2 ∨ -b^{2, 331}_1 ∨ -b^{2, 331}_0 ∨ false 
c  in DIMACS:
-5639 -5640 -5641  0

c i = 332
c  -2+1 --> -1
c    ( b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧  p_664) -> ( b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0)
c  in CNF:
c    -b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨  b^{2, 333}_2
c    -b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_1
c    -b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨  b^{2, 333}_0
c  in DIMACS:
-5642 -5643  5644 -664  5645 0
-5642 -5643  5644 -664 -5646 0
-5642 -5643  5644 -664  5647 0

c  -1+1 --> 0
c    ( b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0 ∧  p_664) -> (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧ -b^{2, 333}_0)
c  in CNF:
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_2
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_1
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_0
c  in DIMACS:
-5642  5643 -5644 -664 -5645 0
-5642  5643 -5644 -664 -5646 0
-5642  5643 -5644 -664 -5647 0

c  0+1 --> 1
c    (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧  p_664) -> (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0)
c  in CNF:
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_2
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_1
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨  b^{2, 333}_0
c  in DIMACS:
 5642  5643  5644 -664 -5645 0
 5642  5643  5644 -664 -5646 0
 5642  5643  5644 -664  5647 0

c  1+1 --> 2
c    (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0 ∧  p_664) -> (-b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0)
c  in CNF:
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_2
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨  b^{2, 333}_1
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ -p_664 ∨ -b^{2, 333}_0
c  in DIMACS:
 5642  5643 -5644 -664 -5645 0
 5642  5643 -5644 -664  5646 0
 5642  5643 -5644 -664 -5647 0

c  2+1 --> break 
c    (-b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧  p_664) -> break
c  in CNF:
c     b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 5642 -5643  5644 -664 1162 0


c  2-1 --> 1
c    (-b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧ -p_664) -> (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0)
c  in CNF:
c     b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_2
c     b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_1
c     b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨  b^{2, 333}_0
c  in DIMACS:
 5642 -5643  5644  664 -5645 0
 5642 -5643  5644  664 -5646 0
 5642 -5643  5644  664  5647 0

c  1-1 --> 0
c    (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0 ∧ -p_664) -> (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧ -b^{2, 333}_0)
c  in CNF:
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_2
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_1
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_0
c  in DIMACS:
 5642  5643 -5644  664 -5645 0
 5642  5643 -5644  664 -5646 0
 5642  5643 -5644  664 -5647 0

c  0-1 --> -1
c    (-b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧ -p_664) -> ( b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0)
c  in CNF:
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨  b^{2, 333}_2
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_1
c     b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨  b^{2, 333}_0
c  in DIMACS:
 5642  5643  5644  664  5645 0
 5642  5643  5644  664 -5646 0
 5642  5643  5644  664  5647 0

c  -1-1 --> -2
c    ( b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧  b^{2, 332}_0 ∧ -p_664) -> ( b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0)
c  in CNF:
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨  b^{2, 333}_2
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨  b^{2, 333}_1
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨  p_664 ∨ -b^{2, 333}_0
c  in DIMACS:
-5642  5643 -5644  664  5645 0
-5642  5643 -5644  664  5646 0
-5642  5643 -5644  664 -5647 0

c  -2-1 --> break 
c    ( b^{2, 332}_2 ∧  b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨  b^{2, 332}_0 ∨  p_664 ∨ break
c  in DIMACS:
-5642 -5643  5644  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 332}_2 ∧ -b^{2, 332}_1 ∧ -b^{2, 332}_0 ∧ true) 
c  in CNF:
c    -b^{2, 332}_2 ∨  b^{2, 332}_1 ∨  b^{2, 332}_0 ∨ false 
c  in DIMACS:
-5642  5643  5644  0

c  3 does not represent an automaton state.
c    -(-b^{2, 332}_2 ∧  b^{2, 332}_1 ∧  b^{2, 332}_0 ∧ true) 
c  in CNF:
c     b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ false 
c  in DIMACS:
 5642 -5643 -5644  0
c  -3 does not represent an automaton state.
c    -( b^{2, 332}_2 ∧  b^{2, 332}_1 ∧  b^{2, 332}_0 ∧ true) 
c  in CNF:
c    -b^{2, 332}_2 ∨ -b^{2, 332}_1 ∨ -b^{2, 332}_0 ∨ false 
c  in DIMACS:
-5642 -5643 -5644  0

c i = 333
c  -2+1 --> -1
c    ( b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧  p_666) -> ( b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0)
c  in CNF:
c    -b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨  b^{2, 334}_2
c    -b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_1
c    -b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨  b^{2, 334}_0
c  in DIMACS:
-5645 -5646  5647 -666  5648 0
-5645 -5646  5647 -666 -5649 0
-5645 -5646  5647 -666  5650 0

c  -1+1 --> 0
c    ( b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0 ∧  p_666) -> (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧ -b^{2, 334}_0)
c  in CNF:
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_2
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_1
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_0
c  in DIMACS:
-5645  5646 -5647 -666 -5648 0
-5645  5646 -5647 -666 -5649 0
-5645  5646 -5647 -666 -5650 0

c  0+1 --> 1
c    (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧  p_666) -> (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0)
c  in CNF:
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_2
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_1
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨  b^{2, 334}_0
c  in DIMACS:
 5645  5646  5647 -666 -5648 0
 5645  5646  5647 -666 -5649 0
 5645  5646  5647 -666  5650 0

c  1+1 --> 2
c    (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0 ∧  p_666) -> (-b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0)
c  in CNF:
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_2
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨  b^{2, 334}_1
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ -p_666 ∨ -b^{2, 334}_0
c  in DIMACS:
 5645  5646 -5647 -666 -5648 0
 5645  5646 -5647 -666  5649 0
 5645  5646 -5647 -666 -5650 0

c  2+1 --> break 
c    (-b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧  p_666) -> break
c  in CNF:
c     b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 5645 -5646  5647 -666 1162 0


c  2-1 --> 1
c    (-b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧ -p_666) -> (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0)
c  in CNF:
c     b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_2
c     b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_1
c     b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨  b^{2, 334}_0
c  in DIMACS:
 5645 -5646  5647  666 -5648 0
 5645 -5646  5647  666 -5649 0
 5645 -5646  5647  666  5650 0

c  1-1 --> 0
c    (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0 ∧ -p_666) -> (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧ -b^{2, 334}_0)
c  in CNF:
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_2
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_1
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_0
c  in DIMACS:
 5645  5646 -5647  666 -5648 0
 5645  5646 -5647  666 -5649 0
 5645  5646 -5647  666 -5650 0

c  0-1 --> -1
c    (-b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧ -p_666) -> ( b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0)
c  in CNF:
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨  b^{2, 334}_2
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_1
c     b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨  b^{2, 334}_0
c  in DIMACS:
 5645  5646  5647  666  5648 0
 5645  5646  5647  666 -5649 0
 5645  5646  5647  666  5650 0

c  -1-1 --> -2
c    ( b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧  b^{2, 333}_0 ∧ -p_666) -> ( b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0)
c  in CNF:
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨  b^{2, 334}_2
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨  b^{2, 334}_1
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨  p_666 ∨ -b^{2, 334}_0
c  in DIMACS:
-5645  5646 -5647  666  5648 0
-5645  5646 -5647  666  5649 0
-5645  5646 -5647  666 -5650 0

c  -2-1 --> break 
c    ( b^{2, 333}_2 ∧  b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨  b^{2, 333}_0 ∨  p_666 ∨ break
c  in DIMACS:
-5645 -5646  5647  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 333}_2 ∧ -b^{2, 333}_1 ∧ -b^{2, 333}_0 ∧ true) 
c  in CNF:
c    -b^{2, 333}_2 ∨  b^{2, 333}_1 ∨  b^{2, 333}_0 ∨ false 
c  in DIMACS:
-5645  5646  5647  0

c  3 does not represent an automaton state.
c    -(-b^{2, 333}_2 ∧  b^{2, 333}_1 ∧  b^{2, 333}_0 ∧ true) 
c  in CNF:
c     b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ false 
c  in DIMACS:
 5645 -5646 -5647  0
c  -3 does not represent an automaton state.
c    -( b^{2, 333}_2 ∧  b^{2, 333}_1 ∧  b^{2, 333}_0 ∧ true) 
c  in CNF:
c    -b^{2, 333}_2 ∨ -b^{2, 333}_1 ∨ -b^{2, 333}_0 ∨ false 
c  in DIMACS:
-5645 -5646 -5647  0

c i = 334
c  -2+1 --> -1
c    ( b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧  p_668) -> ( b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0)
c  in CNF:
c    -b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨  b^{2, 335}_2
c    -b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_1
c    -b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨  b^{2, 335}_0
c  in DIMACS:
-5648 -5649  5650 -668  5651 0
-5648 -5649  5650 -668 -5652 0
-5648 -5649  5650 -668  5653 0

c  -1+1 --> 0
c    ( b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0 ∧  p_668) -> (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧ -b^{2, 335}_0)
c  in CNF:
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_2
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_1
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_0
c  in DIMACS:
-5648  5649 -5650 -668 -5651 0
-5648  5649 -5650 -668 -5652 0
-5648  5649 -5650 -668 -5653 0

c  0+1 --> 1
c    (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧  p_668) -> (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0)
c  in CNF:
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_2
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_1
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨  b^{2, 335}_0
c  in DIMACS:
 5648  5649  5650 -668 -5651 0
 5648  5649  5650 -668 -5652 0
 5648  5649  5650 -668  5653 0

c  1+1 --> 2
c    (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0 ∧  p_668) -> (-b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0)
c  in CNF:
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_2
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨  b^{2, 335}_1
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ -p_668 ∨ -b^{2, 335}_0
c  in DIMACS:
 5648  5649 -5650 -668 -5651 0
 5648  5649 -5650 -668  5652 0
 5648  5649 -5650 -668 -5653 0

c  2+1 --> break 
c    (-b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧  p_668) -> break
c  in CNF:
c     b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ -p_668 ∨ break
c  in DIMACS:
 5648 -5649  5650 -668 1162 0


c  2-1 --> 1
c    (-b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧ -p_668) -> (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0)
c  in CNF:
c     b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_2
c     b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_1
c     b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨  b^{2, 335}_0
c  in DIMACS:
 5648 -5649  5650  668 -5651 0
 5648 -5649  5650  668 -5652 0
 5648 -5649  5650  668  5653 0

c  1-1 --> 0
c    (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0 ∧ -p_668) -> (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧ -b^{2, 335}_0)
c  in CNF:
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_2
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_1
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_0
c  in DIMACS:
 5648  5649 -5650  668 -5651 0
 5648  5649 -5650  668 -5652 0
 5648  5649 -5650  668 -5653 0

c  0-1 --> -1
c    (-b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧ -p_668) -> ( b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0)
c  in CNF:
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨  b^{2, 335}_2
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_1
c     b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨  b^{2, 335}_0
c  in DIMACS:
 5648  5649  5650  668  5651 0
 5648  5649  5650  668 -5652 0
 5648  5649  5650  668  5653 0

c  -1-1 --> -2
c    ( b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧  b^{2, 334}_0 ∧ -p_668) -> ( b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0)
c  in CNF:
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨  b^{2, 335}_2
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨  b^{2, 335}_1
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨  p_668 ∨ -b^{2, 335}_0
c  in DIMACS:
-5648  5649 -5650  668  5651 0
-5648  5649 -5650  668  5652 0
-5648  5649 -5650  668 -5653 0

c  -2-1 --> break 
c    ( b^{2, 334}_2 ∧  b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧ -p_668) -> break
c  in CNF:
c    -b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨  b^{2, 334}_0 ∨  p_668 ∨ break
c  in DIMACS:
-5648 -5649  5650  668 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 334}_2 ∧ -b^{2, 334}_1 ∧ -b^{2, 334}_0 ∧ true) 
c  in CNF:
c    -b^{2, 334}_2 ∨  b^{2, 334}_1 ∨  b^{2, 334}_0 ∨ false 
c  in DIMACS:
-5648  5649  5650  0

c  3 does not represent an automaton state.
c    -(-b^{2, 334}_2 ∧  b^{2, 334}_1 ∧  b^{2, 334}_0 ∧ true) 
c  in CNF:
c     b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ false 
c  in DIMACS:
 5648 -5649 -5650  0
c  -3 does not represent an automaton state.
c    -( b^{2, 334}_2 ∧  b^{2, 334}_1 ∧  b^{2, 334}_0 ∧ true) 
c  in CNF:
c    -b^{2, 334}_2 ∨ -b^{2, 334}_1 ∨ -b^{2, 334}_0 ∨ false 
c  in DIMACS:
-5648 -5649 -5650  0

c i = 335
c  -2+1 --> -1
c    ( b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧  p_670) -> ( b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0)
c  in CNF:
c    -b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨  b^{2, 336}_2
c    -b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_1
c    -b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨  b^{2, 336}_0
c  in DIMACS:
-5651 -5652  5653 -670  5654 0
-5651 -5652  5653 -670 -5655 0
-5651 -5652  5653 -670  5656 0

c  -1+1 --> 0
c    ( b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0 ∧  p_670) -> (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧ -b^{2, 336}_0)
c  in CNF:
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_2
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_1
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_0
c  in DIMACS:
-5651  5652 -5653 -670 -5654 0
-5651  5652 -5653 -670 -5655 0
-5651  5652 -5653 -670 -5656 0

c  0+1 --> 1
c    (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧  p_670) -> (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0)
c  in CNF:
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_2
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_1
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨  b^{2, 336}_0
c  in DIMACS:
 5651  5652  5653 -670 -5654 0
 5651  5652  5653 -670 -5655 0
 5651  5652  5653 -670  5656 0

c  1+1 --> 2
c    (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0 ∧  p_670) -> (-b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0)
c  in CNF:
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_2
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨  b^{2, 336}_1
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ -p_670 ∨ -b^{2, 336}_0
c  in DIMACS:
 5651  5652 -5653 -670 -5654 0
 5651  5652 -5653 -670  5655 0
 5651  5652 -5653 -670 -5656 0

c  2+1 --> break 
c    (-b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧  p_670) -> break
c  in CNF:
c     b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 5651 -5652  5653 -670 1162 0


c  2-1 --> 1
c    (-b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧ -p_670) -> (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0)
c  in CNF:
c     b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_2
c     b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_1
c     b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨  b^{2, 336}_0
c  in DIMACS:
 5651 -5652  5653  670 -5654 0
 5651 -5652  5653  670 -5655 0
 5651 -5652  5653  670  5656 0

c  1-1 --> 0
c    (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0 ∧ -p_670) -> (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧ -b^{2, 336}_0)
c  in CNF:
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_2
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_1
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_0
c  in DIMACS:
 5651  5652 -5653  670 -5654 0
 5651  5652 -5653  670 -5655 0
 5651  5652 -5653  670 -5656 0

c  0-1 --> -1
c    (-b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧ -p_670) -> ( b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0)
c  in CNF:
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨  b^{2, 336}_2
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_1
c     b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨  b^{2, 336}_0
c  in DIMACS:
 5651  5652  5653  670  5654 0
 5651  5652  5653  670 -5655 0
 5651  5652  5653  670  5656 0

c  -1-1 --> -2
c    ( b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧  b^{2, 335}_0 ∧ -p_670) -> ( b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0)
c  in CNF:
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨  b^{2, 336}_2
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨  b^{2, 336}_1
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨  p_670 ∨ -b^{2, 336}_0
c  in DIMACS:
-5651  5652 -5653  670  5654 0
-5651  5652 -5653  670  5655 0
-5651  5652 -5653  670 -5656 0

c  -2-1 --> break 
c    ( b^{2, 335}_2 ∧  b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨  b^{2, 335}_0 ∨  p_670 ∨ break
c  in DIMACS:
-5651 -5652  5653  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 335}_2 ∧ -b^{2, 335}_1 ∧ -b^{2, 335}_0 ∧ true) 
c  in CNF:
c    -b^{2, 335}_2 ∨  b^{2, 335}_1 ∨  b^{2, 335}_0 ∨ false 
c  in DIMACS:
-5651  5652  5653  0

c  3 does not represent an automaton state.
c    -(-b^{2, 335}_2 ∧  b^{2, 335}_1 ∧  b^{2, 335}_0 ∧ true) 
c  in CNF:
c     b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ false 
c  in DIMACS:
 5651 -5652 -5653  0
c  -3 does not represent an automaton state.
c    -( b^{2, 335}_2 ∧  b^{2, 335}_1 ∧  b^{2, 335}_0 ∧ true) 
c  in CNF:
c    -b^{2, 335}_2 ∨ -b^{2, 335}_1 ∨ -b^{2, 335}_0 ∨ false 
c  in DIMACS:
-5651 -5652 -5653  0

c i = 336
c  -2+1 --> -1
c    ( b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧  p_672) -> ( b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0)
c  in CNF:
c    -b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨  b^{2, 337}_2
c    -b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_1
c    -b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨  b^{2, 337}_0
c  in DIMACS:
-5654 -5655  5656 -672  5657 0
-5654 -5655  5656 -672 -5658 0
-5654 -5655  5656 -672  5659 0

c  -1+1 --> 0
c    ( b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0 ∧  p_672) -> (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧ -b^{2, 337}_0)
c  in CNF:
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_2
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_1
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_0
c  in DIMACS:
-5654  5655 -5656 -672 -5657 0
-5654  5655 -5656 -672 -5658 0
-5654  5655 -5656 -672 -5659 0

c  0+1 --> 1
c    (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧  p_672) -> (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0)
c  in CNF:
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_2
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_1
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨  b^{2, 337}_0
c  in DIMACS:
 5654  5655  5656 -672 -5657 0
 5654  5655  5656 -672 -5658 0
 5654  5655  5656 -672  5659 0

c  1+1 --> 2
c    (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0 ∧  p_672) -> (-b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0)
c  in CNF:
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_2
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨  b^{2, 337}_1
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ -p_672 ∨ -b^{2, 337}_0
c  in DIMACS:
 5654  5655 -5656 -672 -5657 0
 5654  5655 -5656 -672  5658 0
 5654  5655 -5656 -672 -5659 0

c  2+1 --> break 
c    (-b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧  p_672) -> break
c  in CNF:
c     b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 5654 -5655  5656 -672 1162 0


c  2-1 --> 1
c    (-b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧ -p_672) -> (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0)
c  in CNF:
c     b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_2
c     b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_1
c     b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨  b^{2, 337}_0
c  in DIMACS:
 5654 -5655  5656  672 -5657 0
 5654 -5655  5656  672 -5658 0
 5654 -5655  5656  672  5659 0

c  1-1 --> 0
c    (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0 ∧ -p_672) -> (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧ -b^{2, 337}_0)
c  in CNF:
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_2
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_1
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_0
c  in DIMACS:
 5654  5655 -5656  672 -5657 0
 5654  5655 -5656  672 -5658 0
 5654  5655 -5656  672 -5659 0

c  0-1 --> -1
c    (-b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧ -p_672) -> ( b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0)
c  in CNF:
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨  b^{2, 337}_2
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_1
c     b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨  b^{2, 337}_0
c  in DIMACS:
 5654  5655  5656  672  5657 0
 5654  5655  5656  672 -5658 0
 5654  5655  5656  672  5659 0

c  -1-1 --> -2
c    ( b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧  b^{2, 336}_0 ∧ -p_672) -> ( b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0)
c  in CNF:
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨  b^{2, 337}_2
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨  b^{2, 337}_1
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨  p_672 ∨ -b^{2, 337}_0
c  in DIMACS:
-5654  5655 -5656  672  5657 0
-5654  5655 -5656  672  5658 0
-5654  5655 -5656  672 -5659 0

c  -2-1 --> break 
c    ( b^{2, 336}_2 ∧  b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨  b^{2, 336}_0 ∨  p_672 ∨ break
c  in DIMACS:
-5654 -5655  5656  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 336}_2 ∧ -b^{2, 336}_1 ∧ -b^{2, 336}_0 ∧ true) 
c  in CNF:
c    -b^{2, 336}_2 ∨  b^{2, 336}_1 ∨  b^{2, 336}_0 ∨ false 
c  in DIMACS:
-5654  5655  5656  0

c  3 does not represent an automaton state.
c    -(-b^{2, 336}_2 ∧  b^{2, 336}_1 ∧  b^{2, 336}_0 ∧ true) 
c  in CNF:
c     b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ false 
c  in DIMACS:
 5654 -5655 -5656  0
c  -3 does not represent an automaton state.
c    -( b^{2, 336}_2 ∧  b^{2, 336}_1 ∧  b^{2, 336}_0 ∧ true) 
c  in CNF:
c    -b^{2, 336}_2 ∨ -b^{2, 336}_1 ∨ -b^{2, 336}_0 ∨ false 
c  in DIMACS:
-5654 -5655 -5656  0

c i = 337
c  -2+1 --> -1
c    ( b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧  p_674) -> ( b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0)
c  in CNF:
c    -b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨  b^{2, 338}_2
c    -b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_1
c    -b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨  b^{2, 338}_0
c  in DIMACS:
-5657 -5658  5659 -674  5660 0
-5657 -5658  5659 -674 -5661 0
-5657 -5658  5659 -674  5662 0

c  -1+1 --> 0
c    ( b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0 ∧  p_674) -> (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧ -b^{2, 338}_0)
c  in CNF:
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_2
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_1
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_0
c  in DIMACS:
-5657  5658 -5659 -674 -5660 0
-5657  5658 -5659 -674 -5661 0
-5657  5658 -5659 -674 -5662 0

c  0+1 --> 1
c    (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧  p_674) -> (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0)
c  in CNF:
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_2
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_1
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨  b^{2, 338}_0
c  in DIMACS:
 5657  5658  5659 -674 -5660 0
 5657  5658  5659 -674 -5661 0
 5657  5658  5659 -674  5662 0

c  1+1 --> 2
c    (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0 ∧  p_674) -> (-b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0)
c  in CNF:
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_2
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨  b^{2, 338}_1
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ -p_674 ∨ -b^{2, 338}_0
c  in DIMACS:
 5657  5658 -5659 -674 -5660 0
 5657  5658 -5659 -674  5661 0
 5657  5658 -5659 -674 -5662 0

c  2+1 --> break 
c    (-b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧  p_674) -> break
c  in CNF:
c     b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ -p_674 ∨ break
c  in DIMACS:
 5657 -5658  5659 -674 1162 0


c  2-1 --> 1
c    (-b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧ -p_674) -> (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0)
c  in CNF:
c     b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_2
c     b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_1
c     b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨  b^{2, 338}_0
c  in DIMACS:
 5657 -5658  5659  674 -5660 0
 5657 -5658  5659  674 -5661 0
 5657 -5658  5659  674  5662 0

c  1-1 --> 0
c    (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0 ∧ -p_674) -> (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧ -b^{2, 338}_0)
c  in CNF:
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_2
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_1
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_0
c  in DIMACS:
 5657  5658 -5659  674 -5660 0
 5657  5658 -5659  674 -5661 0
 5657  5658 -5659  674 -5662 0

c  0-1 --> -1
c    (-b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧ -p_674) -> ( b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0)
c  in CNF:
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨  b^{2, 338}_2
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_1
c     b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨  b^{2, 338}_0
c  in DIMACS:
 5657  5658  5659  674  5660 0
 5657  5658  5659  674 -5661 0
 5657  5658  5659  674  5662 0

c  -1-1 --> -2
c    ( b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧  b^{2, 337}_0 ∧ -p_674) -> ( b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0)
c  in CNF:
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨  b^{2, 338}_2
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨  b^{2, 338}_1
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨  p_674 ∨ -b^{2, 338}_0
c  in DIMACS:
-5657  5658 -5659  674  5660 0
-5657  5658 -5659  674  5661 0
-5657  5658 -5659  674 -5662 0

c  -2-1 --> break 
c    ( b^{2, 337}_2 ∧  b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧ -p_674) -> break
c  in CNF:
c    -b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨  b^{2, 337}_0 ∨  p_674 ∨ break
c  in DIMACS:
-5657 -5658  5659  674 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 337}_2 ∧ -b^{2, 337}_1 ∧ -b^{2, 337}_0 ∧ true) 
c  in CNF:
c    -b^{2, 337}_2 ∨  b^{2, 337}_1 ∨  b^{2, 337}_0 ∨ false 
c  in DIMACS:
-5657  5658  5659  0

c  3 does not represent an automaton state.
c    -(-b^{2, 337}_2 ∧  b^{2, 337}_1 ∧  b^{2, 337}_0 ∧ true) 
c  in CNF:
c     b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ false 
c  in DIMACS:
 5657 -5658 -5659  0
c  -3 does not represent an automaton state.
c    -( b^{2, 337}_2 ∧  b^{2, 337}_1 ∧  b^{2, 337}_0 ∧ true) 
c  in CNF:
c    -b^{2, 337}_2 ∨ -b^{2, 337}_1 ∨ -b^{2, 337}_0 ∨ false 
c  in DIMACS:
-5657 -5658 -5659  0

c i = 338
c  -2+1 --> -1
c    ( b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧  p_676) -> ( b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0)
c  in CNF:
c    -b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨  b^{2, 339}_2
c    -b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_1
c    -b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨  b^{2, 339}_0
c  in DIMACS:
-5660 -5661  5662 -676  5663 0
-5660 -5661  5662 -676 -5664 0
-5660 -5661  5662 -676  5665 0

c  -1+1 --> 0
c    ( b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0 ∧  p_676) -> (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧ -b^{2, 339}_0)
c  in CNF:
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_2
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_1
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_0
c  in DIMACS:
-5660  5661 -5662 -676 -5663 0
-5660  5661 -5662 -676 -5664 0
-5660  5661 -5662 -676 -5665 0

c  0+1 --> 1
c    (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧  p_676) -> (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0)
c  in CNF:
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_2
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_1
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨  b^{2, 339}_0
c  in DIMACS:
 5660  5661  5662 -676 -5663 0
 5660  5661  5662 -676 -5664 0
 5660  5661  5662 -676  5665 0

c  1+1 --> 2
c    (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0 ∧  p_676) -> (-b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0)
c  in CNF:
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_2
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨  b^{2, 339}_1
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ -p_676 ∨ -b^{2, 339}_0
c  in DIMACS:
 5660  5661 -5662 -676 -5663 0
 5660  5661 -5662 -676  5664 0
 5660  5661 -5662 -676 -5665 0

c  2+1 --> break 
c    (-b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧  p_676) -> break
c  in CNF:
c     b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 5660 -5661  5662 -676 1162 0


c  2-1 --> 1
c    (-b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧ -p_676) -> (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0)
c  in CNF:
c     b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_2
c     b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_1
c     b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨  b^{2, 339}_0
c  in DIMACS:
 5660 -5661  5662  676 -5663 0
 5660 -5661  5662  676 -5664 0
 5660 -5661  5662  676  5665 0

c  1-1 --> 0
c    (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0 ∧ -p_676) -> (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧ -b^{2, 339}_0)
c  in CNF:
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_2
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_1
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_0
c  in DIMACS:
 5660  5661 -5662  676 -5663 0
 5660  5661 -5662  676 -5664 0
 5660  5661 -5662  676 -5665 0

c  0-1 --> -1
c    (-b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧ -p_676) -> ( b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0)
c  in CNF:
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨  b^{2, 339}_2
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_1
c     b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨  b^{2, 339}_0
c  in DIMACS:
 5660  5661  5662  676  5663 0
 5660  5661  5662  676 -5664 0
 5660  5661  5662  676  5665 0

c  -1-1 --> -2
c    ( b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧  b^{2, 338}_0 ∧ -p_676) -> ( b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0)
c  in CNF:
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨  b^{2, 339}_2
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨  b^{2, 339}_1
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨  p_676 ∨ -b^{2, 339}_0
c  in DIMACS:
-5660  5661 -5662  676  5663 0
-5660  5661 -5662  676  5664 0
-5660  5661 -5662  676 -5665 0

c  -2-1 --> break 
c    ( b^{2, 338}_2 ∧  b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨  b^{2, 338}_0 ∨  p_676 ∨ break
c  in DIMACS:
-5660 -5661  5662  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 338}_2 ∧ -b^{2, 338}_1 ∧ -b^{2, 338}_0 ∧ true) 
c  in CNF:
c    -b^{2, 338}_2 ∨  b^{2, 338}_1 ∨  b^{2, 338}_0 ∨ false 
c  in DIMACS:
-5660  5661  5662  0

c  3 does not represent an automaton state.
c    -(-b^{2, 338}_2 ∧  b^{2, 338}_1 ∧  b^{2, 338}_0 ∧ true) 
c  in CNF:
c     b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ false 
c  in DIMACS:
 5660 -5661 -5662  0
c  -3 does not represent an automaton state.
c    -( b^{2, 338}_2 ∧  b^{2, 338}_1 ∧  b^{2, 338}_0 ∧ true) 
c  in CNF:
c    -b^{2, 338}_2 ∨ -b^{2, 338}_1 ∨ -b^{2, 338}_0 ∨ false 
c  in DIMACS:
-5660 -5661 -5662  0

c i = 339
c  -2+1 --> -1
c    ( b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧  p_678) -> ( b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0)
c  in CNF:
c    -b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨  b^{2, 340}_2
c    -b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_1
c    -b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨  b^{2, 340}_0
c  in DIMACS:
-5663 -5664  5665 -678  5666 0
-5663 -5664  5665 -678 -5667 0
-5663 -5664  5665 -678  5668 0

c  -1+1 --> 0
c    ( b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0 ∧  p_678) -> (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧ -b^{2, 340}_0)
c  in CNF:
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_2
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_1
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_0
c  in DIMACS:
-5663  5664 -5665 -678 -5666 0
-5663  5664 -5665 -678 -5667 0
-5663  5664 -5665 -678 -5668 0

c  0+1 --> 1
c    (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧  p_678) -> (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0)
c  in CNF:
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_2
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_1
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨  b^{2, 340}_0
c  in DIMACS:
 5663  5664  5665 -678 -5666 0
 5663  5664  5665 -678 -5667 0
 5663  5664  5665 -678  5668 0

c  1+1 --> 2
c    (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0 ∧  p_678) -> (-b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0)
c  in CNF:
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_2
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨  b^{2, 340}_1
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ -p_678 ∨ -b^{2, 340}_0
c  in DIMACS:
 5663  5664 -5665 -678 -5666 0
 5663  5664 -5665 -678  5667 0
 5663  5664 -5665 -678 -5668 0

c  2+1 --> break 
c    (-b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧  p_678) -> break
c  in CNF:
c     b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 5663 -5664  5665 -678 1162 0


c  2-1 --> 1
c    (-b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧ -p_678) -> (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0)
c  in CNF:
c     b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_2
c     b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_1
c     b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨  b^{2, 340}_0
c  in DIMACS:
 5663 -5664  5665  678 -5666 0
 5663 -5664  5665  678 -5667 0
 5663 -5664  5665  678  5668 0

c  1-1 --> 0
c    (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0 ∧ -p_678) -> (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧ -b^{2, 340}_0)
c  in CNF:
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_2
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_1
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_0
c  in DIMACS:
 5663  5664 -5665  678 -5666 0
 5663  5664 -5665  678 -5667 0
 5663  5664 -5665  678 -5668 0

c  0-1 --> -1
c    (-b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧ -p_678) -> ( b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0)
c  in CNF:
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨  b^{2, 340}_2
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_1
c     b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨  b^{2, 340}_0
c  in DIMACS:
 5663  5664  5665  678  5666 0
 5663  5664  5665  678 -5667 0
 5663  5664  5665  678  5668 0

c  -1-1 --> -2
c    ( b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧  b^{2, 339}_0 ∧ -p_678) -> ( b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0)
c  in CNF:
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨  b^{2, 340}_2
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨  b^{2, 340}_1
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨  p_678 ∨ -b^{2, 340}_0
c  in DIMACS:
-5663  5664 -5665  678  5666 0
-5663  5664 -5665  678  5667 0
-5663  5664 -5665  678 -5668 0

c  -2-1 --> break 
c    ( b^{2, 339}_2 ∧  b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨  b^{2, 339}_0 ∨  p_678 ∨ break
c  in DIMACS:
-5663 -5664  5665  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 339}_2 ∧ -b^{2, 339}_1 ∧ -b^{2, 339}_0 ∧ true) 
c  in CNF:
c    -b^{2, 339}_2 ∨  b^{2, 339}_1 ∨  b^{2, 339}_0 ∨ false 
c  in DIMACS:
-5663  5664  5665  0

c  3 does not represent an automaton state.
c    -(-b^{2, 339}_2 ∧  b^{2, 339}_1 ∧  b^{2, 339}_0 ∧ true) 
c  in CNF:
c     b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ false 
c  in DIMACS:
 5663 -5664 -5665  0
c  -3 does not represent an automaton state.
c    -( b^{2, 339}_2 ∧  b^{2, 339}_1 ∧  b^{2, 339}_0 ∧ true) 
c  in CNF:
c    -b^{2, 339}_2 ∨ -b^{2, 339}_1 ∨ -b^{2, 339}_0 ∨ false 
c  in DIMACS:
-5663 -5664 -5665  0

c i = 340
c  -2+1 --> -1
c    ( b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧  p_680) -> ( b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0)
c  in CNF:
c    -b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨  b^{2, 341}_2
c    -b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_1
c    -b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨  b^{2, 341}_0
c  in DIMACS:
-5666 -5667  5668 -680  5669 0
-5666 -5667  5668 -680 -5670 0
-5666 -5667  5668 -680  5671 0

c  -1+1 --> 0
c    ( b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0 ∧  p_680) -> (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧ -b^{2, 341}_0)
c  in CNF:
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_2
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_1
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_0
c  in DIMACS:
-5666  5667 -5668 -680 -5669 0
-5666  5667 -5668 -680 -5670 0
-5666  5667 -5668 -680 -5671 0

c  0+1 --> 1
c    (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧  p_680) -> (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0)
c  in CNF:
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_2
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_1
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨  b^{2, 341}_0
c  in DIMACS:
 5666  5667  5668 -680 -5669 0
 5666  5667  5668 -680 -5670 0
 5666  5667  5668 -680  5671 0

c  1+1 --> 2
c    (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0 ∧  p_680) -> (-b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0)
c  in CNF:
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_2
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨  b^{2, 341}_1
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ -p_680 ∨ -b^{2, 341}_0
c  in DIMACS:
 5666  5667 -5668 -680 -5669 0
 5666  5667 -5668 -680  5670 0
 5666  5667 -5668 -680 -5671 0

c  2+1 --> break 
c    (-b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧  p_680) -> break
c  in CNF:
c     b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 5666 -5667  5668 -680 1162 0


c  2-1 --> 1
c    (-b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧ -p_680) -> (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0)
c  in CNF:
c     b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_2
c     b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_1
c     b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨  b^{2, 341}_0
c  in DIMACS:
 5666 -5667  5668  680 -5669 0
 5666 -5667  5668  680 -5670 0
 5666 -5667  5668  680  5671 0

c  1-1 --> 0
c    (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0 ∧ -p_680) -> (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧ -b^{2, 341}_0)
c  in CNF:
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_2
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_1
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_0
c  in DIMACS:
 5666  5667 -5668  680 -5669 0
 5666  5667 -5668  680 -5670 0
 5666  5667 -5668  680 -5671 0

c  0-1 --> -1
c    (-b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧ -p_680) -> ( b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0)
c  in CNF:
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨  b^{2, 341}_2
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_1
c     b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨  b^{2, 341}_0
c  in DIMACS:
 5666  5667  5668  680  5669 0
 5666  5667  5668  680 -5670 0
 5666  5667  5668  680  5671 0

c  -1-1 --> -2
c    ( b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧  b^{2, 340}_0 ∧ -p_680) -> ( b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0)
c  in CNF:
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨  b^{2, 341}_2
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨  b^{2, 341}_1
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨  p_680 ∨ -b^{2, 341}_0
c  in DIMACS:
-5666  5667 -5668  680  5669 0
-5666  5667 -5668  680  5670 0
-5666  5667 -5668  680 -5671 0

c  -2-1 --> break 
c    ( b^{2, 340}_2 ∧  b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨  b^{2, 340}_0 ∨  p_680 ∨ break
c  in DIMACS:
-5666 -5667  5668  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 340}_2 ∧ -b^{2, 340}_1 ∧ -b^{2, 340}_0 ∧ true) 
c  in CNF:
c    -b^{2, 340}_2 ∨  b^{2, 340}_1 ∨  b^{2, 340}_0 ∨ false 
c  in DIMACS:
-5666  5667  5668  0

c  3 does not represent an automaton state.
c    -(-b^{2, 340}_2 ∧  b^{2, 340}_1 ∧  b^{2, 340}_0 ∧ true) 
c  in CNF:
c     b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ false 
c  in DIMACS:
 5666 -5667 -5668  0
c  -3 does not represent an automaton state.
c    -( b^{2, 340}_2 ∧  b^{2, 340}_1 ∧  b^{2, 340}_0 ∧ true) 
c  in CNF:
c    -b^{2, 340}_2 ∨ -b^{2, 340}_1 ∨ -b^{2, 340}_0 ∨ false 
c  in DIMACS:
-5666 -5667 -5668  0

c i = 341
c  -2+1 --> -1
c    ( b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧  p_682) -> ( b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0)
c  in CNF:
c    -b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨  b^{2, 342}_2
c    -b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_1
c    -b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨  b^{2, 342}_0
c  in DIMACS:
-5669 -5670  5671 -682  5672 0
-5669 -5670  5671 -682 -5673 0
-5669 -5670  5671 -682  5674 0

c  -1+1 --> 0
c    ( b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0 ∧  p_682) -> (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧ -b^{2, 342}_0)
c  in CNF:
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_2
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_1
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_0
c  in DIMACS:
-5669  5670 -5671 -682 -5672 0
-5669  5670 -5671 -682 -5673 0
-5669  5670 -5671 -682 -5674 0

c  0+1 --> 1
c    (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧  p_682) -> (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0)
c  in CNF:
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_2
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_1
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨  b^{2, 342}_0
c  in DIMACS:
 5669  5670  5671 -682 -5672 0
 5669  5670  5671 -682 -5673 0
 5669  5670  5671 -682  5674 0

c  1+1 --> 2
c    (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0 ∧  p_682) -> (-b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0)
c  in CNF:
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_2
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨  b^{2, 342}_1
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ -p_682 ∨ -b^{2, 342}_0
c  in DIMACS:
 5669  5670 -5671 -682 -5672 0
 5669  5670 -5671 -682  5673 0
 5669  5670 -5671 -682 -5674 0

c  2+1 --> break 
c    (-b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧  p_682) -> break
c  in CNF:
c     b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 5669 -5670  5671 -682 1162 0


c  2-1 --> 1
c    (-b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧ -p_682) -> (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0)
c  in CNF:
c     b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_2
c     b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_1
c     b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨  b^{2, 342}_0
c  in DIMACS:
 5669 -5670  5671  682 -5672 0
 5669 -5670  5671  682 -5673 0
 5669 -5670  5671  682  5674 0

c  1-1 --> 0
c    (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0 ∧ -p_682) -> (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧ -b^{2, 342}_0)
c  in CNF:
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_2
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_1
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_0
c  in DIMACS:
 5669  5670 -5671  682 -5672 0
 5669  5670 -5671  682 -5673 0
 5669  5670 -5671  682 -5674 0

c  0-1 --> -1
c    (-b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧ -p_682) -> ( b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0)
c  in CNF:
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨  b^{2, 342}_2
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_1
c     b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨  b^{2, 342}_0
c  in DIMACS:
 5669  5670  5671  682  5672 0
 5669  5670  5671  682 -5673 0
 5669  5670  5671  682  5674 0

c  -1-1 --> -2
c    ( b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧  b^{2, 341}_0 ∧ -p_682) -> ( b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0)
c  in CNF:
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨  b^{2, 342}_2
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨  b^{2, 342}_1
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨  p_682 ∨ -b^{2, 342}_0
c  in DIMACS:
-5669  5670 -5671  682  5672 0
-5669  5670 -5671  682  5673 0
-5669  5670 -5671  682 -5674 0

c  -2-1 --> break 
c    ( b^{2, 341}_2 ∧  b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨  b^{2, 341}_0 ∨  p_682 ∨ break
c  in DIMACS:
-5669 -5670  5671  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 341}_2 ∧ -b^{2, 341}_1 ∧ -b^{2, 341}_0 ∧ true) 
c  in CNF:
c    -b^{2, 341}_2 ∨  b^{2, 341}_1 ∨  b^{2, 341}_0 ∨ false 
c  in DIMACS:
-5669  5670  5671  0

c  3 does not represent an automaton state.
c    -(-b^{2, 341}_2 ∧  b^{2, 341}_1 ∧  b^{2, 341}_0 ∧ true) 
c  in CNF:
c     b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ false 
c  in DIMACS:
 5669 -5670 -5671  0
c  -3 does not represent an automaton state.
c    -( b^{2, 341}_2 ∧  b^{2, 341}_1 ∧  b^{2, 341}_0 ∧ true) 
c  in CNF:
c    -b^{2, 341}_2 ∨ -b^{2, 341}_1 ∨ -b^{2, 341}_0 ∨ false 
c  in DIMACS:
-5669 -5670 -5671  0

c i = 342
c  -2+1 --> -1
c    ( b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧  p_684) -> ( b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0)
c  in CNF:
c    -b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨  b^{2, 343}_2
c    -b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_1
c    -b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨  b^{2, 343}_0
c  in DIMACS:
-5672 -5673  5674 -684  5675 0
-5672 -5673  5674 -684 -5676 0
-5672 -5673  5674 -684  5677 0

c  -1+1 --> 0
c    ( b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0 ∧  p_684) -> (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧ -b^{2, 343}_0)
c  in CNF:
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_2
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_1
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_0
c  in DIMACS:
-5672  5673 -5674 -684 -5675 0
-5672  5673 -5674 -684 -5676 0
-5672  5673 -5674 -684 -5677 0

c  0+1 --> 1
c    (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧  p_684) -> (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0)
c  in CNF:
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_2
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_1
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨  b^{2, 343}_0
c  in DIMACS:
 5672  5673  5674 -684 -5675 0
 5672  5673  5674 -684 -5676 0
 5672  5673  5674 -684  5677 0

c  1+1 --> 2
c    (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0 ∧  p_684) -> (-b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0)
c  in CNF:
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_2
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨  b^{2, 343}_1
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ -p_684 ∨ -b^{2, 343}_0
c  in DIMACS:
 5672  5673 -5674 -684 -5675 0
 5672  5673 -5674 -684  5676 0
 5672  5673 -5674 -684 -5677 0

c  2+1 --> break 
c    (-b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧  p_684) -> break
c  in CNF:
c     b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 5672 -5673  5674 -684 1162 0


c  2-1 --> 1
c    (-b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧ -p_684) -> (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0)
c  in CNF:
c     b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_2
c     b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_1
c     b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨  b^{2, 343}_0
c  in DIMACS:
 5672 -5673  5674  684 -5675 0
 5672 -5673  5674  684 -5676 0
 5672 -5673  5674  684  5677 0

c  1-1 --> 0
c    (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0 ∧ -p_684) -> (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧ -b^{2, 343}_0)
c  in CNF:
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_2
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_1
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_0
c  in DIMACS:
 5672  5673 -5674  684 -5675 0
 5672  5673 -5674  684 -5676 0
 5672  5673 -5674  684 -5677 0

c  0-1 --> -1
c    (-b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧ -p_684) -> ( b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0)
c  in CNF:
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨  b^{2, 343}_2
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_1
c     b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨  b^{2, 343}_0
c  in DIMACS:
 5672  5673  5674  684  5675 0
 5672  5673  5674  684 -5676 0
 5672  5673  5674  684  5677 0

c  -1-1 --> -2
c    ( b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧  b^{2, 342}_0 ∧ -p_684) -> ( b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0)
c  in CNF:
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨  b^{2, 343}_2
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨  b^{2, 343}_1
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨  p_684 ∨ -b^{2, 343}_0
c  in DIMACS:
-5672  5673 -5674  684  5675 0
-5672  5673 -5674  684  5676 0
-5672  5673 -5674  684 -5677 0

c  -2-1 --> break 
c    ( b^{2, 342}_2 ∧  b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨  b^{2, 342}_0 ∨  p_684 ∨ break
c  in DIMACS:
-5672 -5673  5674  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 342}_2 ∧ -b^{2, 342}_1 ∧ -b^{2, 342}_0 ∧ true) 
c  in CNF:
c    -b^{2, 342}_2 ∨  b^{2, 342}_1 ∨  b^{2, 342}_0 ∨ false 
c  in DIMACS:
-5672  5673  5674  0

c  3 does not represent an automaton state.
c    -(-b^{2, 342}_2 ∧  b^{2, 342}_1 ∧  b^{2, 342}_0 ∧ true) 
c  in CNF:
c     b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ false 
c  in DIMACS:
 5672 -5673 -5674  0
c  -3 does not represent an automaton state.
c    -( b^{2, 342}_2 ∧  b^{2, 342}_1 ∧  b^{2, 342}_0 ∧ true) 
c  in CNF:
c    -b^{2, 342}_2 ∨ -b^{2, 342}_1 ∨ -b^{2, 342}_0 ∨ false 
c  in DIMACS:
-5672 -5673 -5674  0

c i = 343
c  -2+1 --> -1
c    ( b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧  p_686) -> ( b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0)
c  in CNF:
c    -b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨  b^{2, 344}_2
c    -b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_1
c    -b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨  b^{2, 344}_0
c  in DIMACS:
-5675 -5676  5677 -686  5678 0
-5675 -5676  5677 -686 -5679 0
-5675 -5676  5677 -686  5680 0

c  -1+1 --> 0
c    ( b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0 ∧  p_686) -> (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧ -b^{2, 344}_0)
c  in CNF:
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_2
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_1
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_0
c  in DIMACS:
-5675  5676 -5677 -686 -5678 0
-5675  5676 -5677 -686 -5679 0
-5675  5676 -5677 -686 -5680 0

c  0+1 --> 1
c    (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧  p_686) -> (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0)
c  in CNF:
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_2
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_1
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨  b^{2, 344}_0
c  in DIMACS:
 5675  5676  5677 -686 -5678 0
 5675  5676  5677 -686 -5679 0
 5675  5676  5677 -686  5680 0

c  1+1 --> 2
c    (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0 ∧  p_686) -> (-b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0)
c  in CNF:
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_2
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨  b^{2, 344}_1
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ -p_686 ∨ -b^{2, 344}_0
c  in DIMACS:
 5675  5676 -5677 -686 -5678 0
 5675  5676 -5677 -686  5679 0
 5675  5676 -5677 -686 -5680 0

c  2+1 --> break 
c    (-b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧  p_686) -> break
c  in CNF:
c     b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 5675 -5676  5677 -686 1162 0


c  2-1 --> 1
c    (-b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧ -p_686) -> (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0)
c  in CNF:
c     b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_2
c     b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_1
c     b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨  b^{2, 344}_0
c  in DIMACS:
 5675 -5676  5677  686 -5678 0
 5675 -5676  5677  686 -5679 0
 5675 -5676  5677  686  5680 0

c  1-1 --> 0
c    (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0 ∧ -p_686) -> (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧ -b^{2, 344}_0)
c  in CNF:
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_2
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_1
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_0
c  in DIMACS:
 5675  5676 -5677  686 -5678 0
 5675  5676 -5677  686 -5679 0
 5675  5676 -5677  686 -5680 0

c  0-1 --> -1
c    (-b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧ -p_686) -> ( b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0)
c  in CNF:
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨  b^{2, 344}_2
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_1
c     b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨  b^{2, 344}_0
c  in DIMACS:
 5675  5676  5677  686  5678 0
 5675  5676  5677  686 -5679 0
 5675  5676  5677  686  5680 0

c  -1-1 --> -2
c    ( b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧  b^{2, 343}_0 ∧ -p_686) -> ( b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0)
c  in CNF:
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨  b^{2, 344}_2
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨  b^{2, 344}_1
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨  p_686 ∨ -b^{2, 344}_0
c  in DIMACS:
-5675  5676 -5677  686  5678 0
-5675  5676 -5677  686  5679 0
-5675  5676 -5677  686 -5680 0

c  -2-1 --> break 
c    ( b^{2, 343}_2 ∧  b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨  b^{2, 343}_0 ∨  p_686 ∨ break
c  in DIMACS:
-5675 -5676  5677  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 343}_2 ∧ -b^{2, 343}_1 ∧ -b^{2, 343}_0 ∧ true) 
c  in CNF:
c    -b^{2, 343}_2 ∨  b^{2, 343}_1 ∨  b^{2, 343}_0 ∨ false 
c  in DIMACS:
-5675  5676  5677  0

c  3 does not represent an automaton state.
c    -(-b^{2, 343}_2 ∧  b^{2, 343}_1 ∧  b^{2, 343}_0 ∧ true) 
c  in CNF:
c     b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ false 
c  in DIMACS:
 5675 -5676 -5677  0
c  -3 does not represent an automaton state.
c    -( b^{2, 343}_2 ∧  b^{2, 343}_1 ∧  b^{2, 343}_0 ∧ true) 
c  in CNF:
c    -b^{2, 343}_2 ∨ -b^{2, 343}_1 ∨ -b^{2, 343}_0 ∨ false 
c  in DIMACS:
-5675 -5676 -5677  0

c i = 344
c  -2+1 --> -1
c    ( b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧  p_688) -> ( b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0)
c  in CNF:
c    -b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨  b^{2, 345}_2
c    -b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_1
c    -b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨  b^{2, 345}_0
c  in DIMACS:
-5678 -5679  5680 -688  5681 0
-5678 -5679  5680 -688 -5682 0
-5678 -5679  5680 -688  5683 0

c  -1+1 --> 0
c    ( b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0 ∧  p_688) -> (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧ -b^{2, 345}_0)
c  in CNF:
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_2
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_1
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_0
c  in DIMACS:
-5678  5679 -5680 -688 -5681 0
-5678  5679 -5680 -688 -5682 0
-5678  5679 -5680 -688 -5683 0

c  0+1 --> 1
c    (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧  p_688) -> (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0)
c  in CNF:
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_2
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_1
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨  b^{2, 345}_0
c  in DIMACS:
 5678  5679  5680 -688 -5681 0
 5678  5679  5680 -688 -5682 0
 5678  5679  5680 -688  5683 0

c  1+1 --> 2
c    (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0 ∧  p_688) -> (-b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0)
c  in CNF:
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_2
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨  b^{2, 345}_1
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ -p_688 ∨ -b^{2, 345}_0
c  in DIMACS:
 5678  5679 -5680 -688 -5681 0
 5678  5679 -5680 -688  5682 0
 5678  5679 -5680 -688 -5683 0

c  2+1 --> break 
c    (-b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧  p_688) -> break
c  in CNF:
c     b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 5678 -5679  5680 -688 1162 0


c  2-1 --> 1
c    (-b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧ -p_688) -> (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0)
c  in CNF:
c     b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_2
c     b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_1
c     b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨  b^{2, 345}_0
c  in DIMACS:
 5678 -5679  5680  688 -5681 0
 5678 -5679  5680  688 -5682 0
 5678 -5679  5680  688  5683 0

c  1-1 --> 0
c    (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0 ∧ -p_688) -> (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧ -b^{2, 345}_0)
c  in CNF:
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_2
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_1
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_0
c  in DIMACS:
 5678  5679 -5680  688 -5681 0
 5678  5679 -5680  688 -5682 0
 5678  5679 -5680  688 -5683 0

c  0-1 --> -1
c    (-b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧ -p_688) -> ( b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0)
c  in CNF:
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨  b^{2, 345}_2
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_1
c     b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨  b^{2, 345}_0
c  in DIMACS:
 5678  5679  5680  688  5681 0
 5678  5679  5680  688 -5682 0
 5678  5679  5680  688  5683 0

c  -1-1 --> -2
c    ( b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧  b^{2, 344}_0 ∧ -p_688) -> ( b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0)
c  in CNF:
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨  b^{2, 345}_2
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨  b^{2, 345}_1
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨  p_688 ∨ -b^{2, 345}_0
c  in DIMACS:
-5678  5679 -5680  688  5681 0
-5678  5679 -5680  688  5682 0
-5678  5679 -5680  688 -5683 0

c  -2-1 --> break 
c    ( b^{2, 344}_2 ∧  b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨  b^{2, 344}_0 ∨  p_688 ∨ break
c  in DIMACS:
-5678 -5679  5680  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 344}_2 ∧ -b^{2, 344}_1 ∧ -b^{2, 344}_0 ∧ true) 
c  in CNF:
c    -b^{2, 344}_2 ∨  b^{2, 344}_1 ∨  b^{2, 344}_0 ∨ false 
c  in DIMACS:
-5678  5679  5680  0

c  3 does not represent an automaton state.
c    -(-b^{2, 344}_2 ∧  b^{2, 344}_1 ∧  b^{2, 344}_0 ∧ true) 
c  in CNF:
c     b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ false 
c  in DIMACS:
 5678 -5679 -5680  0
c  -3 does not represent an automaton state.
c    -( b^{2, 344}_2 ∧  b^{2, 344}_1 ∧  b^{2, 344}_0 ∧ true) 
c  in CNF:
c    -b^{2, 344}_2 ∨ -b^{2, 344}_1 ∨ -b^{2, 344}_0 ∨ false 
c  in DIMACS:
-5678 -5679 -5680  0

c i = 345
c  -2+1 --> -1
c    ( b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧  p_690) -> ( b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0)
c  in CNF:
c    -b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨  b^{2, 346}_2
c    -b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_1
c    -b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨  b^{2, 346}_0
c  in DIMACS:
-5681 -5682  5683 -690  5684 0
-5681 -5682  5683 -690 -5685 0
-5681 -5682  5683 -690  5686 0

c  -1+1 --> 0
c    ( b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0 ∧  p_690) -> (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧ -b^{2, 346}_0)
c  in CNF:
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_2
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_1
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_0
c  in DIMACS:
-5681  5682 -5683 -690 -5684 0
-5681  5682 -5683 -690 -5685 0
-5681  5682 -5683 -690 -5686 0

c  0+1 --> 1
c    (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧  p_690) -> (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0)
c  in CNF:
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_2
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_1
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨  b^{2, 346}_0
c  in DIMACS:
 5681  5682  5683 -690 -5684 0
 5681  5682  5683 -690 -5685 0
 5681  5682  5683 -690  5686 0

c  1+1 --> 2
c    (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0 ∧  p_690) -> (-b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0)
c  in CNF:
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_2
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨  b^{2, 346}_1
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ -p_690 ∨ -b^{2, 346}_0
c  in DIMACS:
 5681  5682 -5683 -690 -5684 0
 5681  5682 -5683 -690  5685 0
 5681  5682 -5683 -690 -5686 0

c  2+1 --> break 
c    (-b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧  p_690) -> break
c  in CNF:
c     b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 5681 -5682  5683 -690 1162 0


c  2-1 --> 1
c    (-b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧ -p_690) -> (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0)
c  in CNF:
c     b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_2
c     b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_1
c     b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨  b^{2, 346}_0
c  in DIMACS:
 5681 -5682  5683  690 -5684 0
 5681 -5682  5683  690 -5685 0
 5681 -5682  5683  690  5686 0

c  1-1 --> 0
c    (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0 ∧ -p_690) -> (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧ -b^{2, 346}_0)
c  in CNF:
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_2
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_1
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_0
c  in DIMACS:
 5681  5682 -5683  690 -5684 0
 5681  5682 -5683  690 -5685 0
 5681  5682 -5683  690 -5686 0

c  0-1 --> -1
c    (-b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧ -p_690) -> ( b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0)
c  in CNF:
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨  b^{2, 346}_2
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_1
c     b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨  b^{2, 346}_0
c  in DIMACS:
 5681  5682  5683  690  5684 0
 5681  5682  5683  690 -5685 0
 5681  5682  5683  690  5686 0

c  -1-1 --> -2
c    ( b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧  b^{2, 345}_0 ∧ -p_690) -> ( b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0)
c  in CNF:
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨  b^{2, 346}_2
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨  b^{2, 346}_1
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨  p_690 ∨ -b^{2, 346}_0
c  in DIMACS:
-5681  5682 -5683  690  5684 0
-5681  5682 -5683  690  5685 0
-5681  5682 -5683  690 -5686 0

c  -2-1 --> break 
c    ( b^{2, 345}_2 ∧  b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨  b^{2, 345}_0 ∨  p_690 ∨ break
c  in DIMACS:
-5681 -5682  5683  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 345}_2 ∧ -b^{2, 345}_1 ∧ -b^{2, 345}_0 ∧ true) 
c  in CNF:
c    -b^{2, 345}_2 ∨  b^{2, 345}_1 ∨  b^{2, 345}_0 ∨ false 
c  in DIMACS:
-5681  5682  5683  0

c  3 does not represent an automaton state.
c    -(-b^{2, 345}_2 ∧  b^{2, 345}_1 ∧  b^{2, 345}_0 ∧ true) 
c  in CNF:
c     b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ false 
c  in DIMACS:
 5681 -5682 -5683  0
c  -3 does not represent an automaton state.
c    -( b^{2, 345}_2 ∧  b^{2, 345}_1 ∧  b^{2, 345}_0 ∧ true) 
c  in CNF:
c    -b^{2, 345}_2 ∨ -b^{2, 345}_1 ∨ -b^{2, 345}_0 ∨ false 
c  in DIMACS:
-5681 -5682 -5683  0

c i = 346
c  -2+1 --> -1
c    ( b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧  p_692) -> ( b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0)
c  in CNF:
c    -b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨  b^{2, 347}_2
c    -b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_1
c    -b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨  b^{2, 347}_0
c  in DIMACS:
-5684 -5685  5686 -692  5687 0
-5684 -5685  5686 -692 -5688 0
-5684 -5685  5686 -692  5689 0

c  -1+1 --> 0
c    ( b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0 ∧  p_692) -> (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧ -b^{2, 347}_0)
c  in CNF:
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_2
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_1
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_0
c  in DIMACS:
-5684  5685 -5686 -692 -5687 0
-5684  5685 -5686 -692 -5688 0
-5684  5685 -5686 -692 -5689 0

c  0+1 --> 1
c    (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧  p_692) -> (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0)
c  in CNF:
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_2
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_1
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨  b^{2, 347}_0
c  in DIMACS:
 5684  5685  5686 -692 -5687 0
 5684  5685  5686 -692 -5688 0
 5684  5685  5686 -692  5689 0

c  1+1 --> 2
c    (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0 ∧  p_692) -> (-b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0)
c  in CNF:
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_2
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨  b^{2, 347}_1
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ -p_692 ∨ -b^{2, 347}_0
c  in DIMACS:
 5684  5685 -5686 -692 -5687 0
 5684  5685 -5686 -692  5688 0
 5684  5685 -5686 -692 -5689 0

c  2+1 --> break 
c    (-b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧  p_692) -> break
c  in CNF:
c     b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ -p_692 ∨ break
c  in DIMACS:
 5684 -5685  5686 -692 1162 0


c  2-1 --> 1
c    (-b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧ -p_692) -> (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0)
c  in CNF:
c     b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_2
c     b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_1
c     b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨  b^{2, 347}_0
c  in DIMACS:
 5684 -5685  5686  692 -5687 0
 5684 -5685  5686  692 -5688 0
 5684 -5685  5686  692  5689 0

c  1-1 --> 0
c    (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0 ∧ -p_692) -> (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧ -b^{2, 347}_0)
c  in CNF:
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_2
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_1
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_0
c  in DIMACS:
 5684  5685 -5686  692 -5687 0
 5684  5685 -5686  692 -5688 0
 5684  5685 -5686  692 -5689 0

c  0-1 --> -1
c    (-b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧ -p_692) -> ( b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0)
c  in CNF:
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨  b^{2, 347}_2
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_1
c     b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨  b^{2, 347}_0
c  in DIMACS:
 5684  5685  5686  692  5687 0
 5684  5685  5686  692 -5688 0
 5684  5685  5686  692  5689 0

c  -1-1 --> -2
c    ( b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧  b^{2, 346}_0 ∧ -p_692) -> ( b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0)
c  in CNF:
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨  b^{2, 347}_2
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨  b^{2, 347}_1
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨  p_692 ∨ -b^{2, 347}_0
c  in DIMACS:
-5684  5685 -5686  692  5687 0
-5684  5685 -5686  692  5688 0
-5684  5685 -5686  692 -5689 0

c  -2-1 --> break 
c    ( b^{2, 346}_2 ∧  b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧ -p_692) -> break
c  in CNF:
c    -b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨  b^{2, 346}_0 ∨  p_692 ∨ break
c  in DIMACS:
-5684 -5685  5686  692 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 346}_2 ∧ -b^{2, 346}_1 ∧ -b^{2, 346}_0 ∧ true) 
c  in CNF:
c    -b^{2, 346}_2 ∨  b^{2, 346}_1 ∨  b^{2, 346}_0 ∨ false 
c  in DIMACS:
-5684  5685  5686  0

c  3 does not represent an automaton state.
c    -(-b^{2, 346}_2 ∧  b^{2, 346}_1 ∧  b^{2, 346}_0 ∧ true) 
c  in CNF:
c     b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ false 
c  in DIMACS:
 5684 -5685 -5686  0
c  -3 does not represent an automaton state.
c    -( b^{2, 346}_2 ∧  b^{2, 346}_1 ∧  b^{2, 346}_0 ∧ true) 
c  in CNF:
c    -b^{2, 346}_2 ∨ -b^{2, 346}_1 ∨ -b^{2, 346}_0 ∨ false 
c  in DIMACS:
-5684 -5685 -5686  0

c i = 347
c  -2+1 --> -1
c    ( b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧  p_694) -> ( b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0)
c  in CNF:
c    -b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨  b^{2, 348}_2
c    -b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_1
c    -b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨  b^{2, 348}_0
c  in DIMACS:
-5687 -5688  5689 -694  5690 0
-5687 -5688  5689 -694 -5691 0
-5687 -5688  5689 -694  5692 0

c  -1+1 --> 0
c    ( b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0 ∧  p_694) -> (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧ -b^{2, 348}_0)
c  in CNF:
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_2
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_1
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_0
c  in DIMACS:
-5687  5688 -5689 -694 -5690 0
-5687  5688 -5689 -694 -5691 0
-5687  5688 -5689 -694 -5692 0

c  0+1 --> 1
c    (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧  p_694) -> (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0)
c  in CNF:
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_2
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_1
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨  b^{2, 348}_0
c  in DIMACS:
 5687  5688  5689 -694 -5690 0
 5687  5688  5689 -694 -5691 0
 5687  5688  5689 -694  5692 0

c  1+1 --> 2
c    (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0 ∧  p_694) -> (-b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0)
c  in CNF:
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_2
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨  b^{2, 348}_1
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ -p_694 ∨ -b^{2, 348}_0
c  in DIMACS:
 5687  5688 -5689 -694 -5690 0
 5687  5688 -5689 -694  5691 0
 5687  5688 -5689 -694 -5692 0

c  2+1 --> break 
c    (-b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧  p_694) -> break
c  in CNF:
c     b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ -p_694 ∨ break
c  in DIMACS:
 5687 -5688  5689 -694 1162 0


c  2-1 --> 1
c    (-b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧ -p_694) -> (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0)
c  in CNF:
c     b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_2
c     b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_1
c     b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨  b^{2, 348}_0
c  in DIMACS:
 5687 -5688  5689  694 -5690 0
 5687 -5688  5689  694 -5691 0
 5687 -5688  5689  694  5692 0

c  1-1 --> 0
c    (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0 ∧ -p_694) -> (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧ -b^{2, 348}_0)
c  in CNF:
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_2
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_1
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_0
c  in DIMACS:
 5687  5688 -5689  694 -5690 0
 5687  5688 -5689  694 -5691 0
 5687  5688 -5689  694 -5692 0

c  0-1 --> -1
c    (-b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧ -p_694) -> ( b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0)
c  in CNF:
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨  b^{2, 348}_2
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_1
c     b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨  b^{2, 348}_0
c  in DIMACS:
 5687  5688  5689  694  5690 0
 5687  5688  5689  694 -5691 0
 5687  5688  5689  694  5692 0

c  -1-1 --> -2
c    ( b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧  b^{2, 347}_0 ∧ -p_694) -> ( b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0)
c  in CNF:
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨  b^{2, 348}_2
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨  b^{2, 348}_1
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨  p_694 ∨ -b^{2, 348}_0
c  in DIMACS:
-5687  5688 -5689  694  5690 0
-5687  5688 -5689  694  5691 0
-5687  5688 -5689  694 -5692 0

c  -2-1 --> break 
c    ( b^{2, 347}_2 ∧  b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧ -p_694) -> break
c  in CNF:
c    -b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨  b^{2, 347}_0 ∨  p_694 ∨ break
c  in DIMACS:
-5687 -5688  5689  694 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 347}_2 ∧ -b^{2, 347}_1 ∧ -b^{2, 347}_0 ∧ true) 
c  in CNF:
c    -b^{2, 347}_2 ∨  b^{2, 347}_1 ∨  b^{2, 347}_0 ∨ false 
c  in DIMACS:
-5687  5688  5689  0

c  3 does not represent an automaton state.
c    -(-b^{2, 347}_2 ∧  b^{2, 347}_1 ∧  b^{2, 347}_0 ∧ true) 
c  in CNF:
c     b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ false 
c  in DIMACS:
 5687 -5688 -5689  0
c  -3 does not represent an automaton state.
c    -( b^{2, 347}_2 ∧  b^{2, 347}_1 ∧  b^{2, 347}_0 ∧ true) 
c  in CNF:
c    -b^{2, 347}_2 ∨ -b^{2, 347}_1 ∨ -b^{2, 347}_0 ∨ false 
c  in DIMACS:
-5687 -5688 -5689  0

c i = 348
c  -2+1 --> -1
c    ( b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧  p_696) -> ( b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0)
c  in CNF:
c    -b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨  b^{2, 349}_2
c    -b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_1
c    -b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨  b^{2, 349}_0
c  in DIMACS:
-5690 -5691  5692 -696  5693 0
-5690 -5691  5692 -696 -5694 0
-5690 -5691  5692 -696  5695 0

c  -1+1 --> 0
c    ( b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0 ∧  p_696) -> (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧ -b^{2, 349}_0)
c  in CNF:
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_2
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_1
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_0
c  in DIMACS:
-5690  5691 -5692 -696 -5693 0
-5690  5691 -5692 -696 -5694 0
-5690  5691 -5692 -696 -5695 0

c  0+1 --> 1
c    (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧  p_696) -> (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0)
c  in CNF:
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_2
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_1
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨  b^{2, 349}_0
c  in DIMACS:
 5690  5691  5692 -696 -5693 0
 5690  5691  5692 -696 -5694 0
 5690  5691  5692 -696  5695 0

c  1+1 --> 2
c    (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0 ∧  p_696) -> (-b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0)
c  in CNF:
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_2
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨  b^{2, 349}_1
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ -p_696 ∨ -b^{2, 349}_0
c  in DIMACS:
 5690  5691 -5692 -696 -5693 0
 5690  5691 -5692 -696  5694 0
 5690  5691 -5692 -696 -5695 0

c  2+1 --> break 
c    (-b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧  p_696) -> break
c  in CNF:
c     b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 5690 -5691  5692 -696 1162 0


c  2-1 --> 1
c    (-b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧ -p_696) -> (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0)
c  in CNF:
c     b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_2
c     b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_1
c     b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨  b^{2, 349}_0
c  in DIMACS:
 5690 -5691  5692  696 -5693 0
 5690 -5691  5692  696 -5694 0
 5690 -5691  5692  696  5695 0

c  1-1 --> 0
c    (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0 ∧ -p_696) -> (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧ -b^{2, 349}_0)
c  in CNF:
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_2
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_1
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_0
c  in DIMACS:
 5690  5691 -5692  696 -5693 0
 5690  5691 -5692  696 -5694 0
 5690  5691 -5692  696 -5695 0

c  0-1 --> -1
c    (-b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧ -p_696) -> ( b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0)
c  in CNF:
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨  b^{2, 349}_2
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_1
c     b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨  b^{2, 349}_0
c  in DIMACS:
 5690  5691  5692  696  5693 0
 5690  5691  5692  696 -5694 0
 5690  5691  5692  696  5695 0

c  -1-1 --> -2
c    ( b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧  b^{2, 348}_0 ∧ -p_696) -> ( b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0)
c  in CNF:
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨  b^{2, 349}_2
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨  b^{2, 349}_1
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨  p_696 ∨ -b^{2, 349}_0
c  in DIMACS:
-5690  5691 -5692  696  5693 0
-5690  5691 -5692  696  5694 0
-5690  5691 -5692  696 -5695 0

c  -2-1 --> break 
c    ( b^{2, 348}_2 ∧  b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨  b^{2, 348}_0 ∨  p_696 ∨ break
c  in DIMACS:
-5690 -5691  5692  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 348}_2 ∧ -b^{2, 348}_1 ∧ -b^{2, 348}_0 ∧ true) 
c  in CNF:
c    -b^{2, 348}_2 ∨  b^{2, 348}_1 ∨  b^{2, 348}_0 ∨ false 
c  in DIMACS:
-5690  5691  5692  0

c  3 does not represent an automaton state.
c    -(-b^{2, 348}_2 ∧  b^{2, 348}_1 ∧  b^{2, 348}_0 ∧ true) 
c  in CNF:
c     b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ false 
c  in DIMACS:
 5690 -5691 -5692  0
c  -3 does not represent an automaton state.
c    -( b^{2, 348}_2 ∧  b^{2, 348}_1 ∧  b^{2, 348}_0 ∧ true) 
c  in CNF:
c    -b^{2, 348}_2 ∨ -b^{2, 348}_1 ∨ -b^{2, 348}_0 ∨ false 
c  in DIMACS:
-5690 -5691 -5692  0

c i = 349
c  -2+1 --> -1
c    ( b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧  p_698) -> ( b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0)
c  in CNF:
c    -b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨  b^{2, 350}_2
c    -b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_1
c    -b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨  b^{2, 350}_0
c  in DIMACS:
-5693 -5694  5695 -698  5696 0
-5693 -5694  5695 -698 -5697 0
-5693 -5694  5695 -698  5698 0

c  -1+1 --> 0
c    ( b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0 ∧  p_698) -> (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧ -b^{2, 350}_0)
c  in CNF:
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_2
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_1
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_0
c  in DIMACS:
-5693  5694 -5695 -698 -5696 0
-5693  5694 -5695 -698 -5697 0
-5693  5694 -5695 -698 -5698 0

c  0+1 --> 1
c    (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧  p_698) -> (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0)
c  in CNF:
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_2
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_1
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨  b^{2, 350}_0
c  in DIMACS:
 5693  5694  5695 -698 -5696 0
 5693  5694  5695 -698 -5697 0
 5693  5694  5695 -698  5698 0

c  1+1 --> 2
c    (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0 ∧  p_698) -> (-b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0)
c  in CNF:
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_2
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨  b^{2, 350}_1
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ -p_698 ∨ -b^{2, 350}_0
c  in DIMACS:
 5693  5694 -5695 -698 -5696 0
 5693  5694 -5695 -698  5697 0
 5693  5694 -5695 -698 -5698 0

c  2+1 --> break 
c    (-b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧  p_698) -> break
c  in CNF:
c     b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ -p_698 ∨ break
c  in DIMACS:
 5693 -5694  5695 -698 1162 0


c  2-1 --> 1
c    (-b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧ -p_698) -> (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0)
c  in CNF:
c     b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_2
c     b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_1
c     b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨  b^{2, 350}_0
c  in DIMACS:
 5693 -5694  5695  698 -5696 0
 5693 -5694  5695  698 -5697 0
 5693 -5694  5695  698  5698 0

c  1-1 --> 0
c    (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0 ∧ -p_698) -> (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧ -b^{2, 350}_0)
c  in CNF:
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_2
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_1
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_0
c  in DIMACS:
 5693  5694 -5695  698 -5696 0
 5693  5694 -5695  698 -5697 0
 5693  5694 -5695  698 -5698 0

c  0-1 --> -1
c    (-b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧ -p_698) -> ( b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0)
c  in CNF:
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨  b^{2, 350}_2
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_1
c     b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨  b^{2, 350}_0
c  in DIMACS:
 5693  5694  5695  698  5696 0
 5693  5694  5695  698 -5697 0
 5693  5694  5695  698  5698 0

c  -1-1 --> -2
c    ( b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧  b^{2, 349}_0 ∧ -p_698) -> ( b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0)
c  in CNF:
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨  b^{2, 350}_2
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨  b^{2, 350}_1
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨  p_698 ∨ -b^{2, 350}_0
c  in DIMACS:
-5693  5694 -5695  698  5696 0
-5693  5694 -5695  698  5697 0
-5693  5694 -5695  698 -5698 0

c  -2-1 --> break 
c    ( b^{2, 349}_2 ∧  b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧ -p_698) -> break
c  in CNF:
c    -b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨  b^{2, 349}_0 ∨  p_698 ∨ break
c  in DIMACS:
-5693 -5694  5695  698 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 349}_2 ∧ -b^{2, 349}_1 ∧ -b^{2, 349}_0 ∧ true) 
c  in CNF:
c    -b^{2, 349}_2 ∨  b^{2, 349}_1 ∨  b^{2, 349}_0 ∨ false 
c  in DIMACS:
-5693  5694  5695  0

c  3 does not represent an automaton state.
c    -(-b^{2, 349}_2 ∧  b^{2, 349}_1 ∧  b^{2, 349}_0 ∧ true) 
c  in CNF:
c     b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ false 
c  in DIMACS:
 5693 -5694 -5695  0
c  -3 does not represent an automaton state.
c    -( b^{2, 349}_2 ∧  b^{2, 349}_1 ∧  b^{2, 349}_0 ∧ true) 
c  in CNF:
c    -b^{2, 349}_2 ∨ -b^{2, 349}_1 ∨ -b^{2, 349}_0 ∨ false 
c  in DIMACS:
-5693 -5694 -5695  0

c i = 350
c  -2+1 --> -1
c    ( b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧  p_700) -> ( b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0)
c  in CNF:
c    -b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨  b^{2, 351}_2
c    -b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_1
c    -b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨  b^{2, 351}_0
c  in DIMACS:
-5696 -5697  5698 -700  5699 0
-5696 -5697  5698 -700 -5700 0
-5696 -5697  5698 -700  5701 0

c  -1+1 --> 0
c    ( b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0 ∧  p_700) -> (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧ -b^{2, 351}_0)
c  in CNF:
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_2
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_1
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_0
c  in DIMACS:
-5696  5697 -5698 -700 -5699 0
-5696  5697 -5698 -700 -5700 0
-5696  5697 -5698 -700 -5701 0

c  0+1 --> 1
c    (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧  p_700) -> (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0)
c  in CNF:
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_2
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_1
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨  b^{2, 351}_0
c  in DIMACS:
 5696  5697  5698 -700 -5699 0
 5696  5697  5698 -700 -5700 0
 5696  5697  5698 -700  5701 0

c  1+1 --> 2
c    (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0 ∧  p_700) -> (-b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0)
c  in CNF:
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_2
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨  b^{2, 351}_1
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ -p_700 ∨ -b^{2, 351}_0
c  in DIMACS:
 5696  5697 -5698 -700 -5699 0
 5696  5697 -5698 -700  5700 0
 5696  5697 -5698 -700 -5701 0

c  2+1 --> break 
c    (-b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧  p_700) -> break
c  in CNF:
c     b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 5696 -5697  5698 -700 1162 0


c  2-1 --> 1
c    (-b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧ -p_700) -> (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0)
c  in CNF:
c     b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_2
c     b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_1
c     b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨  b^{2, 351}_0
c  in DIMACS:
 5696 -5697  5698  700 -5699 0
 5696 -5697  5698  700 -5700 0
 5696 -5697  5698  700  5701 0

c  1-1 --> 0
c    (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0 ∧ -p_700) -> (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧ -b^{2, 351}_0)
c  in CNF:
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_2
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_1
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_0
c  in DIMACS:
 5696  5697 -5698  700 -5699 0
 5696  5697 -5698  700 -5700 0
 5696  5697 -5698  700 -5701 0

c  0-1 --> -1
c    (-b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧ -p_700) -> ( b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0)
c  in CNF:
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨  b^{2, 351}_2
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_1
c     b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨  b^{2, 351}_0
c  in DIMACS:
 5696  5697  5698  700  5699 0
 5696  5697  5698  700 -5700 0
 5696  5697  5698  700  5701 0

c  -1-1 --> -2
c    ( b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧  b^{2, 350}_0 ∧ -p_700) -> ( b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0)
c  in CNF:
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨  b^{2, 351}_2
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨  b^{2, 351}_1
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨  p_700 ∨ -b^{2, 351}_0
c  in DIMACS:
-5696  5697 -5698  700  5699 0
-5696  5697 -5698  700  5700 0
-5696  5697 -5698  700 -5701 0

c  -2-1 --> break 
c    ( b^{2, 350}_2 ∧  b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨  b^{2, 350}_0 ∨  p_700 ∨ break
c  in DIMACS:
-5696 -5697  5698  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 350}_2 ∧ -b^{2, 350}_1 ∧ -b^{2, 350}_0 ∧ true) 
c  in CNF:
c    -b^{2, 350}_2 ∨  b^{2, 350}_1 ∨  b^{2, 350}_0 ∨ false 
c  in DIMACS:
-5696  5697  5698  0

c  3 does not represent an automaton state.
c    -(-b^{2, 350}_2 ∧  b^{2, 350}_1 ∧  b^{2, 350}_0 ∧ true) 
c  in CNF:
c     b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ false 
c  in DIMACS:
 5696 -5697 -5698  0
c  -3 does not represent an automaton state.
c    -( b^{2, 350}_2 ∧  b^{2, 350}_1 ∧  b^{2, 350}_0 ∧ true) 
c  in CNF:
c    -b^{2, 350}_2 ∨ -b^{2, 350}_1 ∨ -b^{2, 350}_0 ∨ false 
c  in DIMACS:
-5696 -5697 -5698  0

c i = 351
c  -2+1 --> -1
c    ( b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧  p_702) -> ( b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0)
c  in CNF:
c    -b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨  b^{2, 352}_2
c    -b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_1
c    -b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨  b^{2, 352}_0
c  in DIMACS:
-5699 -5700  5701 -702  5702 0
-5699 -5700  5701 -702 -5703 0
-5699 -5700  5701 -702  5704 0

c  -1+1 --> 0
c    ( b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0 ∧  p_702) -> (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧ -b^{2, 352}_0)
c  in CNF:
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_2
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_1
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_0
c  in DIMACS:
-5699  5700 -5701 -702 -5702 0
-5699  5700 -5701 -702 -5703 0
-5699  5700 -5701 -702 -5704 0

c  0+1 --> 1
c    (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧  p_702) -> (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0)
c  in CNF:
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_2
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_1
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨  b^{2, 352}_0
c  in DIMACS:
 5699  5700  5701 -702 -5702 0
 5699  5700  5701 -702 -5703 0
 5699  5700  5701 -702  5704 0

c  1+1 --> 2
c    (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0 ∧  p_702) -> (-b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0)
c  in CNF:
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_2
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨  b^{2, 352}_1
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ -p_702 ∨ -b^{2, 352}_0
c  in DIMACS:
 5699  5700 -5701 -702 -5702 0
 5699  5700 -5701 -702  5703 0
 5699  5700 -5701 -702 -5704 0

c  2+1 --> break 
c    (-b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧  p_702) -> break
c  in CNF:
c     b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 5699 -5700  5701 -702 1162 0


c  2-1 --> 1
c    (-b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧ -p_702) -> (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0)
c  in CNF:
c     b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_2
c     b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_1
c     b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨  b^{2, 352}_0
c  in DIMACS:
 5699 -5700  5701  702 -5702 0
 5699 -5700  5701  702 -5703 0
 5699 -5700  5701  702  5704 0

c  1-1 --> 0
c    (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0 ∧ -p_702) -> (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧ -b^{2, 352}_0)
c  in CNF:
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_2
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_1
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_0
c  in DIMACS:
 5699  5700 -5701  702 -5702 0
 5699  5700 -5701  702 -5703 0
 5699  5700 -5701  702 -5704 0

c  0-1 --> -1
c    (-b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧ -p_702) -> ( b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0)
c  in CNF:
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨  b^{2, 352}_2
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_1
c     b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨  b^{2, 352}_0
c  in DIMACS:
 5699  5700  5701  702  5702 0
 5699  5700  5701  702 -5703 0
 5699  5700  5701  702  5704 0

c  -1-1 --> -2
c    ( b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧  b^{2, 351}_0 ∧ -p_702) -> ( b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0)
c  in CNF:
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨  b^{2, 352}_2
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨  b^{2, 352}_1
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨  p_702 ∨ -b^{2, 352}_0
c  in DIMACS:
-5699  5700 -5701  702  5702 0
-5699  5700 -5701  702  5703 0
-5699  5700 -5701  702 -5704 0

c  -2-1 --> break 
c    ( b^{2, 351}_2 ∧  b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨  b^{2, 351}_0 ∨  p_702 ∨ break
c  in DIMACS:
-5699 -5700  5701  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 351}_2 ∧ -b^{2, 351}_1 ∧ -b^{2, 351}_0 ∧ true) 
c  in CNF:
c    -b^{2, 351}_2 ∨  b^{2, 351}_1 ∨  b^{2, 351}_0 ∨ false 
c  in DIMACS:
-5699  5700  5701  0

c  3 does not represent an automaton state.
c    -(-b^{2, 351}_2 ∧  b^{2, 351}_1 ∧  b^{2, 351}_0 ∧ true) 
c  in CNF:
c     b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ false 
c  in DIMACS:
 5699 -5700 -5701  0
c  -3 does not represent an automaton state.
c    -( b^{2, 351}_2 ∧  b^{2, 351}_1 ∧  b^{2, 351}_0 ∧ true) 
c  in CNF:
c    -b^{2, 351}_2 ∨ -b^{2, 351}_1 ∨ -b^{2, 351}_0 ∨ false 
c  in DIMACS:
-5699 -5700 -5701  0

c i = 352
c  -2+1 --> -1
c    ( b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧  p_704) -> ( b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0)
c  in CNF:
c    -b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨  b^{2, 353}_2
c    -b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_1
c    -b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨  b^{2, 353}_0
c  in DIMACS:
-5702 -5703  5704 -704  5705 0
-5702 -5703  5704 -704 -5706 0
-5702 -5703  5704 -704  5707 0

c  -1+1 --> 0
c    ( b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0 ∧  p_704) -> (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧ -b^{2, 353}_0)
c  in CNF:
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_2
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_1
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_0
c  in DIMACS:
-5702  5703 -5704 -704 -5705 0
-5702  5703 -5704 -704 -5706 0
-5702  5703 -5704 -704 -5707 0

c  0+1 --> 1
c    (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧  p_704) -> (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0)
c  in CNF:
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_2
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_1
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨  b^{2, 353}_0
c  in DIMACS:
 5702  5703  5704 -704 -5705 0
 5702  5703  5704 -704 -5706 0
 5702  5703  5704 -704  5707 0

c  1+1 --> 2
c    (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0 ∧  p_704) -> (-b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0)
c  in CNF:
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_2
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨  b^{2, 353}_1
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ -p_704 ∨ -b^{2, 353}_0
c  in DIMACS:
 5702  5703 -5704 -704 -5705 0
 5702  5703 -5704 -704  5706 0
 5702  5703 -5704 -704 -5707 0

c  2+1 --> break 
c    (-b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧  p_704) -> break
c  in CNF:
c     b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 5702 -5703  5704 -704 1162 0


c  2-1 --> 1
c    (-b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧ -p_704) -> (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0)
c  in CNF:
c     b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_2
c     b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_1
c     b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨  b^{2, 353}_0
c  in DIMACS:
 5702 -5703  5704  704 -5705 0
 5702 -5703  5704  704 -5706 0
 5702 -5703  5704  704  5707 0

c  1-1 --> 0
c    (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0 ∧ -p_704) -> (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧ -b^{2, 353}_0)
c  in CNF:
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_2
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_1
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_0
c  in DIMACS:
 5702  5703 -5704  704 -5705 0
 5702  5703 -5704  704 -5706 0
 5702  5703 -5704  704 -5707 0

c  0-1 --> -1
c    (-b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧ -p_704) -> ( b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0)
c  in CNF:
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨  b^{2, 353}_2
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_1
c     b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨  b^{2, 353}_0
c  in DIMACS:
 5702  5703  5704  704  5705 0
 5702  5703  5704  704 -5706 0
 5702  5703  5704  704  5707 0

c  -1-1 --> -2
c    ( b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧  b^{2, 352}_0 ∧ -p_704) -> ( b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0)
c  in CNF:
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨  b^{2, 353}_2
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨  b^{2, 353}_1
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨  p_704 ∨ -b^{2, 353}_0
c  in DIMACS:
-5702  5703 -5704  704  5705 0
-5702  5703 -5704  704  5706 0
-5702  5703 -5704  704 -5707 0

c  -2-1 --> break 
c    ( b^{2, 352}_2 ∧  b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨  b^{2, 352}_0 ∨  p_704 ∨ break
c  in DIMACS:
-5702 -5703  5704  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 352}_2 ∧ -b^{2, 352}_1 ∧ -b^{2, 352}_0 ∧ true) 
c  in CNF:
c    -b^{2, 352}_2 ∨  b^{2, 352}_1 ∨  b^{2, 352}_0 ∨ false 
c  in DIMACS:
-5702  5703  5704  0

c  3 does not represent an automaton state.
c    -(-b^{2, 352}_2 ∧  b^{2, 352}_1 ∧  b^{2, 352}_0 ∧ true) 
c  in CNF:
c     b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ false 
c  in DIMACS:
 5702 -5703 -5704  0
c  -3 does not represent an automaton state.
c    -( b^{2, 352}_2 ∧  b^{2, 352}_1 ∧  b^{2, 352}_0 ∧ true) 
c  in CNF:
c    -b^{2, 352}_2 ∨ -b^{2, 352}_1 ∨ -b^{2, 352}_0 ∨ false 
c  in DIMACS:
-5702 -5703 -5704  0

c i = 353
c  -2+1 --> -1
c    ( b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧  p_706) -> ( b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0)
c  in CNF:
c    -b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨  b^{2, 354}_2
c    -b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_1
c    -b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨  b^{2, 354}_0
c  in DIMACS:
-5705 -5706  5707 -706  5708 0
-5705 -5706  5707 -706 -5709 0
-5705 -5706  5707 -706  5710 0

c  -1+1 --> 0
c    ( b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0 ∧  p_706) -> (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧ -b^{2, 354}_0)
c  in CNF:
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_2
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_1
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_0
c  in DIMACS:
-5705  5706 -5707 -706 -5708 0
-5705  5706 -5707 -706 -5709 0
-5705  5706 -5707 -706 -5710 0

c  0+1 --> 1
c    (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧  p_706) -> (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0)
c  in CNF:
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_2
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_1
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨  b^{2, 354}_0
c  in DIMACS:
 5705  5706  5707 -706 -5708 0
 5705  5706  5707 -706 -5709 0
 5705  5706  5707 -706  5710 0

c  1+1 --> 2
c    (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0 ∧  p_706) -> (-b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0)
c  in CNF:
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_2
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨  b^{2, 354}_1
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ -p_706 ∨ -b^{2, 354}_0
c  in DIMACS:
 5705  5706 -5707 -706 -5708 0
 5705  5706 -5707 -706  5709 0
 5705  5706 -5707 -706 -5710 0

c  2+1 --> break 
c    (-b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧  p_706) -> break
c  in CNF:
c     b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ -p_706 ∨ break
c  in DIMACS:
 5705 -5706  5707 -706 1162 0


c  2-1 --> 1
c    (-b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧ -p_706) -> (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0)
c  in CNF:
c     b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_2
c     b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_1
c     b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨  b^{2, 354}_0
c  in DIMACS:
 5705 -5706  5707  706 -5708 0
 5705 -5706  5707  706 -5709 0
 5705 -5706  5707  706  5710 0

c  1-1 --> 0
c    (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0 ∧ -p_706) -> (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧ -b^{2, 354}_0)
c  in CNF:
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_2
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_1
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_0
c  in DIMACS:
 5705  5706 -5707  706 -5708 0
 5705  5706 -5707  706 -5709 0
 5705  5706 -5707  706 -5710 0

c  0-1 --> -1
c    (-b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧ -p_706) -> ( b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0)
c  in CNF:
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨  b^{2, 354}_2
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_1
c     b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨  b^{2, 354}_0
c  in DIMACS:
 5705  5706  5707  706  5708 0
 5705  5706  5707  706 -5709 0
 5705  5706  5707  706  5710 0

c  -1-1 --> -2
c    ( b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧  b^{2, 353}_0 ∧ -p_706) -> ( b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0)
c  in CNF:
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨  b^{2, 354}_2
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨  b^{2, 354}_1
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨  p_706 ∨ -b^{2, 354}_0
c  in DIMACS:
-5705  5706 -5707  706  5708 0
-5705  5706 -5707  706  5709 0
-5705  5706 -5707  706 -5710 0

c  -2-1 --> break 
c    ( b^{2, 353}_2 ∧  b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧ -p_706) -> break
c  in CNF:
c    -b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨  b^{2, 353}_0 ∨  p_706 ∨ break
c  in DIMACS:
-5705 -5706  5707  706 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 353}_2 ∧ -b^{2, 353}_1 ∧ -b^{2, 353}_0 ∧ true) 
c  in CNF:
c    -b^{2, 353}_2 ∨  b^{2, 353}_1 ∨  b^{2, 353}_0 ∨ false 
c  in DIMACS:
-5705  5706  5707  0

c  3 does not represent an automaton state.
c    -(-b^{2, 353}_2 ∧  b^{2, 353}_1 ∧  b^{2, 353}_0 ∧ true) 
c  in CNF:
c     b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ false 
c  in DIMACS:
 5705 -5706 -5707  0
c  -3 does not represent an automaton state.
c    -( b^{2, 353}_2 ∧  b^{2, 353}_1 ∧  b^{2, 353}_0 ∧ true) 
c  in CNF:
c    -b^{2, 353}_2 ∨ -b^{2, 353}_1 ∨ -b^{2, 353}_0 ∨ false 
c  in DIMACS:
-5705 -5706 -5707  0

c i = 354
c  -2+1 --> -1
c    ( b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧  p_708) -> ( b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0)
c  in CNF:
c    -b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨  b^{2, 355}_2
c    -b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_1
c    -b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨  b^{2, 355}_0
c  in DIMACS:
-5708 -5709  5710 -708  5711 0
-5708 -5709  5710 -708 -5712 0
-5708 -5709  5710 -708  5713 0

c  -1+1 --> 0
c    ( b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0 ∧  p_708) -> (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧ -b^{2, 355}_0)
c  in CNF:
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_2
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_1
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_0
c  in DIMACS:
-5708  5709 -5710 -708 -5711 0
-5708  5709 -5710 -708 -5712 0
-5708  5709 -5710 -708 -5713 0

c  0+1 --> 1
c    (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧  p_708) -> (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0)
c  in CNF:
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_2
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_1
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨  b^{2, 355}_0
c  in DIMACS:
 5708  5709  5710 -708 -5711 0
 5708  5709  5710 -708 -5712 0
 5708  5709  5710 -708  5713 0

c  1+1 --> 2
c    (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0 ∧  p_708) -> (-b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0)
c  in CNF:
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_2
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨  b^{2, 355}_1
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ -p_708 ∨ -b^{2, 355}_0
c  in DIMACS:
 5708  5709 -5710 -708 -5711 0
 5708  5709 -5710 -708  5712 0
 5708  5709 -5710 -708 -5713 0

c  2+1 --> break 
c    (-b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧  p_708) -> break
c  in CNF:
c     b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 5708 -5709  5710 -708 1162 0


c  2-1 --> 1
c    (-b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧ -p_708) -> (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0)
c  in CNF:
c     b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_2
c     b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_1
c     b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨  b^{2, 355}_0
c  in DIMACS:
 5708 -5709  5710  708 -5711 0
 5708 -5709  5710  708 -5712 0
 5708 -5709  5710  708  5713 0

c  1-1 --> 0
c    (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0 ∧ -p_708) -> (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧ -b^{2, 355}_0)
c  in CNF:
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_2
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_1
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_0
c  in DIMACS:
 5708  5709 -5710  708 -5711 0
 5708  5709 -5710  708 -5712 0
 5708  5709 -5710  708 -5713 0

c  0-1 --> -1
c    (-b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧ -p_708) -> ( b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0)
c  in CNF:
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨  b^{2, 355}_2
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_1
c     b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨  b^{2, 355}_0
c  in DIMACS:
 5708  5709  5710  708  5711 0
 5708  5709  5710  708 -5712 0
 5708  5709  5710  708  5713 0

c  -1-1 --> -2
c    ( b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧  b^{2, 354}_0 ∧ -p_708) -> ( b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0)
c  in CNF:
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨  b^{2, 355}_2
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨  b^{2, 355}_1
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨  p_708 ∨ -b^{2, 355}_0
c  in DIMACS:
-5708  5709 -5710  708  5711 0
-5708  5709 -5710  708  5712 0
-5708  5709 -5710  708 -5713 0

c  -2-1 --> break 
c    ( b^{2, 354}_2 ∧  b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨  b^{2, 354}_0 ∨  p_708 ∨ break
c  in DIMACS:
-5708 -5709  5710  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 354}_2 ∧ -b^{2, 354}_1 ∧ -b^{2, 354}_0 ∧ true) 
c  in CNF:
c    -b^{2, 354}_2 ∨  b^{2, 354}_1 ∨  b^{2, 354}_0 ∨ false 
c  in DIMACS:
-5708  5709  5710  0

c  3 does not represent an automaton state.
c    -(-b^{2, 354}_2 ∧  b^{2, 354}_1 ∧  b^{2, 354}_0 ∧ true) 
c  in CNF:
c     b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ false 
c  in DIMACS:
 5708 -5709 -5710  0
c  -3 does not represent an automaton state.
c    -( b^{2, 354}_2 ∧  b^{2, 354}_1 ∧  b^{2, 354}_0 ∧ true) 
c  in CNF:
c    -b^{2, 354}_2 ∨ -b^{2, 354}_1 ∨ -b^{2, 354}_0 ∨ false 
c  in DIMACS:
-5708 -5709 -5710  0

c i = 355
c  -2+1 --> -1
c    ( b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧  p_710) -> ( b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0)
c  in CNF:
c    -b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨  b^{2, 356}_2
c    -b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_1
c    -b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨  b^{2, 356}_0
c  in DIMACS:
-5711 -5712  5713 -710  5714 0
-5711 -5712  5713 -710 -5715 0
-5711 -5712  5713 -710  5716 0

c  -1+1 --> 0
c    ( b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0 ∧  p_710) -> (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧ -b^{2, 356}_0)
c  in CNF:
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_2
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_1
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_0
c  in DIMACS:
-5711  5712 -5713 -710 -5714 0
-5711  5712 -5713 -710 -5715 0
-5711  5712 -5713 -710 -5716 0

c  0+1 --> 1
c    (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧  p_710) -> (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0)
c  in CNF:
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_2
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_1
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨  b^{2, 356}_0
c  in DIMACS:
 5711  5712  5713 -710 -5714 0
 5711  5712  5713 -710 -5715 0
 5711  5712  5713 -710  5716 0

c  1+1 --> 2
c    (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0 ∧  p_710) -> (-b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0)
c  in CNF:
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_2
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨  b^{2, 356}_1
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ -p_710 ∨ -b^{2, 356}_0
c  in DIMACS:
 5711  5712 -5713 -710 -5714 0
 5711  5712 -5713 -710  5715 0
 5711  5712 -5713 -710 -5716 0

c  2+1 --> break 
c    (-b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧  p_710) -> break
c  in CNF:
c     b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 5711 -5712  5713 -710 1162 0


c  2-1 --> 1
c    (-b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧ -p_710) -> (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0)
c  in CNF:
c     b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_2
c     b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_1
c     b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨  b^{2, 356}_0
c  in DIMACS:
 5711 -5712  5713  710 -5714 0
 5711 -5712  5713  710 -5715 0
 5711 -5712  5713  710  5716 0

c  1-1 --> 0
c    (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0 ∧ -p_710) -> (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧ -b^{2, 356}_0)
c  in CNF:
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_2
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_1
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_0
c  in DIMACS:
 5711  5712 -5713  710 -5714 0
 5711  5712 -5713  710 -5715 0
 5711  5712 -5713  710 -5716 0

c  0-1 --> -1
c    (-b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧ -p_710) -> ( b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0)
c  in CNF:
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨  b^{2, 356}_2
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_1
c     b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨  b^{2, 356}_0
c  in DIMACS:
 5711  5712  5713  710  5714 0
 5711  5712  5713  710 -5715 0
 5711  5712  5713  710  5716 0

c  -1-1 --> -2
c    ( b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧  b^{2, 355}_0 ∧ -p_710) -> ( b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0)
c  in CNF:
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨  b^{2, 356}_2
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨  b^{2, 356}_1
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨  p_710 ∨ -b^{2, 356}_0
c  in DIMACS:
-5711  5712 -5713  710  5714 0
-5711  5712 -5713  710  5715 0
-5711  5712 -5713  710 -5716 0

c  -2-1 --> break 
c    ( b^{2, 355}_2 ∧  b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨  b^{2, 355}_0 ∨  p_710 ∨ break
c  in DIMACS:
-5711 -5712  5713  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 355}_2 ∧ -b^{2, 355}_1 ∧ -b^{2, 355}_0 ∧ true) 
c  in CNF:
c    -b^{2, 355}_2 ∨  b^{2, 355}_1 ∨  b^{2, 355}_0 ∨ false 
c  in DIMACS:
-5711  5712  5713  0

c  3 does not represent an automaton state.
c    -(-b^{2, 355}_2 ∧  b^{2, 355}_1 ∧  b^{2, 355}_0 ∧ true) 
c  in CNF:
c     b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ false 
c  in DIMACS:
 5711 -5712 -5713  0
c  -3 does not represent an automaton state.
c    -( b^{2, 355}_2 ∧  b^{2, 355}_1 ∧  b^{2, 355}_0 ∧ true) 
c  in CNF:
c    -b^{2, 355}_2 ∨ -b^{2, 355}_1 ∨ -b^{2, 355}_0 ∨ false 
c  in DIMACS:
-5711 -5712 -5713  0

c i = 356
c  -2+1 --> -1
c    ( b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧  p_712) -> ( b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0)
c  in CNF:
c    -b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨  b^{2, 357}_2
c    -b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_1
c    -b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨  b^{2, 357}_0
c  in DIMACS:
-5714 -5715  5716 -712  5717 0
-5714 -5715  5716 -712 -5718 0
-5714 -5715  5716 -712  5719 0

c  -1+1 --> 0
c    ( b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0 ∧  p_712) -> (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧ -b^{2, 357}_0)
c  in CNF:
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_2
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_1
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_0
c  in DIMACS:
-5714  5715 -5716 -712 -5717 0
-5714  5715 -5716 -712 -5718 0
-5714  5715 -5716 -712 -5719 0

c  0+1 --> 1
c    (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧  p_712) -> (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0)
c  in CNF:
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_2
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_1
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨  b^{2, 357}_0
c  in DIMACS:
 5714  5715  5716 -712 -5717 0
 5714  5715  5716 -712 -5718 0
 5714  5715  5716 -712  5719 0

c  1+1 --> 2
c    (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0 ∧  p_712) -> (-b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0)
c  in CNF:
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_2
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨  b^{2, 357}_1
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ -p_712 ∨ -b^{2, 357}_0
c  in DIMACS:
 5714  5715 -5716 -712 -5717 0
 5714  5715 -5716 -712  5718 0
 5714  5715 -5716 -712 -5719 0

c  2+1 --> break 
c    (-b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧  p_712) -> break
c  in CNF:
c     b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 5714 -5715  5716 -712 1162 0


c  2-1 --> 1
c    (-b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧ -p_712) -> (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0)
c  in CNF:
c     b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_2
c     b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_1
c     b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨  b^{2, 357}_0
c  in DIMACS:
 5714 -5715  5716  712 -5717 0
 5714 -5715  5716  712 -5718 0
 5714 -5715  5716  712  5719 0

c  1-1 --> 0
c    (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0 ∧ -p_712) -> (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧ -b^{2, 357}_0)
c  in CNF:
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_2
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_1
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_0
c  in DIMACS:
 5714  5715 -5716  712 -5717 0
 5714  5715 -5716  712 -5718 0
 5714  5715 -5716  712 -5719 0

c  0-1 --> -1
c    (-b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧ -p_712) -> ( b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0)
c  in CNF:
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨  b^{2, 357}_2
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_1
c     b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨  b^{2, 357}_0
c  in DIMACS:
 5714  5715  5716  712  5717 0
 5714  5715  5716  712 -5718 0
 5714  5715  5716  712  5719 0

c  -1-1 --> -2
c    ( b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧  b^{2, 356}_0 ∧ -p_712) -> ( b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0)
c  in CNF:
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨  b^{2, 357}_2
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨  b^{2, 357}_1
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨  p_712 ∨ -b^{2, 357}_0
c  in DIMACS:
-5714  5715 -5716  712  5717 0
-5714  5715 -5716  712  5718 0
-5714  5715 -5716  712 -5719 0

c  -2-1 --> break 
c    ( b^{2, 356}_2 ∧  b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨  b^{2, 356}_0 ∨  p_712 ∨ break
c  in DIMACS:
-5714 -5715  5716  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 356}_2 ∧ -b^{2, 356}_1 ∧ -b^{2, 356}_0 ∧ true) 
c  in CNF:
c    -b^{2, 356}_2 ∨  b^{2, 356}_1 ∨  b^{2, 356}_0 ∨ false 
c  in DIMACS:
-5714  5715  5716  0

c  3 does not represent an automaton state.
c    -(-b^{2, 356}_2 ∧  b^{2, 356}_1 ∧  b^{2, 356}_0 ∧ true) 
c  in CNF:
c     b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ false 
c  in DIMACS:
 5714 -5715 -5716  0
c  -3 does not represent an automaton state.
c    -( b^{2, 356}_2 ∧  b^{2, 356}_1 ∧  b^{2, 356}_0 ∧ true) 
c  in CNF:
c    -b^{2, 356}_2 ∨ -b^{2, 356}_1 ∨ -b^{2, 356}_0 ∨ false 
c  in DIMACS:
-5714 -5715 -5716  0

c i = 357
c  -2+1 --> -1
c    ( b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧  p_714) -> ( b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0)
c  in CNF:
c    -b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨  b^{2, 358}_2
c    -b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_1
c    -b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨  b^{2, 358}_0
c  in DIMACS:
-5717 -5718  5719 -714  5720 0
-5717 -5718  5719 -714 -5721 0
-5717 -5718  5719 -714  5722 0

c  -1+1 --> 0
c    ( b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0 ∧  p_714) -> (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧ -b^{2, 358}_0)
c  in CNF:
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_2
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_1
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_0
c  in DIMACS:
-5717  5718 -5719 -714 -5720 0
-5717  5718 -5719 -714 -5721 0
-5717  5718 -5719 -714 -5722 0

c  0+1 --> 1
c    (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧  p_714) -> (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0)
c  in CNF:
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_2
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_1
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨  b^{2, 358}_0
c  in DIMACS:
 5717  5718  5719 -714 -5720 0
 5717  5718  5719 -714 -5721 0
 5717  5718  5719 -714  5722 0

c  1+1 --> 2
c    (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0 ∧  p_714) -> (-b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0)
c  in CNF:
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_2
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨  b^{2, 358}_1
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ -p_714 ∨ -b^{2, 358}_0
c  in DIMACS:
 5717  5718 -5719 -714 -5720 0
 5717  5718 -5719 -714  5721 0
 5717  5718 -5719 -714 -5722 0

c  2+1 --> break 
c    (-b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧  p_714) -> break
c  in CNF:
c     b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 5717 -5718  5719 -714 1162 0


c  2-1 --> 1
c    (-b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧ -p_714) -> (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0)
c  in CNF:
c     b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_2
c     b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_1
c     b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨  b^{2, 358}_0
c  in DIMACS:
 5717 -5718  5719  714 -5720 0
 5717 -5718  5719  714 -5721 0
 5717 -5718  5719  714  5722 0

c  1-1 --> 0
c    (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0 ∧ -p_714) -> (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧ -b^{2, 358}_0)
c  in CNF:
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_2
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_1
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_0
c  in DIMACS:
 5717  5718 -5719  714 -5720 0
 5717  5718 -5719  714 -5721 0
 5717  5718 -5719  714 -5722 0

c  0-1 --> -1
c    (-b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧ -p_714) -> ( b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0)
c  in CNF:
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨  b^{2, 358}_2
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_1
c     b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨  b^{2, 358}_0
c  in DIMACS:
 5717  5718  5719  714  5720 0
 5717  5718  5719  714 -5721 0
 5717  5718  5719  714  5722 0

c  -1-1 --> -2
c    ( b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧  b^{2, 357}_0 ∧ -p_714) -> ( b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0)
c  in CNF:
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨  b^{2, 358}_2
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨  b^{2, 358}_1
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨  p_714 ∨ -b^{2, 358}_0
c  in DIMACS:
-5717  5718 -5719  714  5720 0
-5717  5718 -5719  714  5721 0
-5717  5718 -5719  714 -5722 0

c  -2-1 --> break 
c    ( b^{2, 357}_2 ∧  b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨  b^{2, 357}_0 ∨  p_714 ∨ break
c  in DIMACS:
-5717 -5718  5719  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 357}_2 ∧ -b^{2, 357}_1 ∧ -b^{2, 357}_0 ∧ true) 
c  in CNF:
c    -b^{2, 357}_2 ∨  b^{2, 357}_1 ∨  b^{2, 357}_0 ∨ false 
c  in DIMACS:
-5717  5718  5719  0

c  3 does not represent an automaton state.
c    -(-b^{2, 357}_2 ∧  b^{2, 357}_1 ∧  b^{2, 357}_0 ∧ true) 
c  in CNF:
c     b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ false 
c  in DIMACS:
 5717 -5718 -5719  0
c  -3 does not represent an automaton state.
c    -( b^{2, 357}_2 ∧  b^{2, 357}_1 ∧  b^{2, 357}_0 ∧ true) 
c  in CNF:
c    -b^{2, 357}_2 ∨ -b^{2, 357}_1 ∨ -b^{2, 357}_0 ∨ false 
c  in DIMACS:
-5717 -5718 -5719  0

c i = 358
c  -2+1 --> -1
c    ( b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧  p_716) -> ( b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0)
c  in CNF:
c    -b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨  b^{2, 359}_2
c    -b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_1
c    -b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨  b^{2, 359}_0
c  in DIMACS:
-5720 -5721  5722 -716  5723 0
-5720 -5721  5722 -716 -5724 0
-5720 -5721  5722 -716  5725 0

c  -1+1 --> 0
c    ( b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0 ∧  p_716) -> (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧ -b^{2, 359}_0)
c  in CNF:
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_2
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_1
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_0
c  in DIMACS:
-5720  5721 -5722 -716 -5723 0
-5720  5721 -5722 -716 -5724 0
-5720  5721 -5722 -716 -5725 0

c  0+1 --> 1
c    (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧  p_716) -> (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0)
c  in CNF:
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_2
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_1
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨  b^{2, 359}_0
c  in DIMACS:
 5720  5721  5722 -716 -5723 0
 5720  5721  5722 -716 -5724 0
 5720  5721  5722 -716  5725 0

c  1+1 --> 2
c    (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0 ∧  p_716) -> (-b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0)
c  in CNF:
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_2
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨  b^{2, 359}_1
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ -p_716 ∨ -b^{2, 359}_0
c  in DIMACS:
 5720  5721 -5722 -716 -5723 0
 5720  5721 -5722 -716  5724 0
 5720  5721 -5722 -716 -5725 0

c  2+1 --> break 
c    (-b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧  p_716) -> break
c  in CNF:
c     b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ -p_716 ∨ break
c  in DIMACS:
 5720 -5721  5722 -716 1162 0


c  2-1 --> 1
c    (-b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧ -p_716) -> (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0)
c  in CNF:
c     b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_2
c     b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_1
c     b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨  b^{2, 359}_0
c  in DIMACS:
 5720 -5721  5722  716 -5723 0
 5720 -5721  5722  716 -5724 0
 5720 -5721  5722  716  5725 0

c  1-1 --> 0
c    (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0 ∧ -p_716) -> (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧ -b^{2, 359}_0)
c  in CNF:
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_2
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_1
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_0
c  in DIMACS:
 5720  5721 -5722  716 -5723 0
 5720  5721 -5722  716 -5724 0
 5720  5721 -5722  716 -5725 0

c  0-1 --> -1
c    (-b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧ -p_716) -> ( b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0)
c  in CNF:
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨  b^{2, 359}_2
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_1
c     b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨  b^{2, 359}_0
c  in DIMACS:
 5720  5721  5722  716  5723 0
 5720  5721  5722  716 -5724 0
 5720  5721  5722  716  5725 0

c  -1-1 --> -2
c    ( b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧  b^{2, 358}_0 ∧ -p_716) -> ( b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0)
c  in CNF:
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨  b^{2, 359}_2
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨  b^{2, 359}_1
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨  p_716 ∨ -b^{2, 359}_0
c  in DIMACS:
-5720  5721 -5722  716  5723 0
-5720  5721 -5722  716  5724 0
-5720  5721 -5722  716 -5725 0

c  -2-1 --> break 
c    ( b^{2, 358}_2 ∧  b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧ -p_716) -> break
c  in CNF:
c    -b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨  b^{2, 358}_0 ∨  p_716 ∨ break
c  in DIMACS:
-5720 -5721  5722  716 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 358}_2 ∧ -b^{2, 358}_1 ∧ -b^{2, 358}_0 ∧ true) 
c  in CNF:
c    -b^{2, 358}_2 ∨  b^{2, 358}_1 ∨  b^{2, 358}_0 ∨ false 
c  in DIMACS:
-5720  5721  5722  0

c  3 does not represent an automaton state.
c    -(-b^{2, 358}_2 ∧  b^{2, 358}_1 ∧  b^{2, 358}_0 ∧ true) 
c  in CNF:
c     b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ false 
c  in DIMACS:
 5720 -5721 -5722  0
c  -3 does not represent an automaton state.
c    -( b^{2, 358}_2 ∧  b^{2, 358}_1 ∧  b^{2, 358}_0 ∧ true) 
c  in CNF:
c    -b^{2, 358}_2 ∨ -b^{2, 358}_1 ∨ -b^{2, 358}_0 ∨ false 
c  in DIMACS:
-5720 -5721 -5722  0

c i = 359
c  -2+1 --> -1
c    ( b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧  p_718) -> ( b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0)
c  in CNF:
c    -b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨  b^{2, 360}_2
c    -b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_1
c    -b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨  b^{2, 360}_0
c  in DIMACS:
-5723 -5724  5725 -718  5726 0
-5723 -5724  5725 -718 -5727 0
-5723 -5724  5725 -718  5728 0

c  -1+1 --> 0
c    ( b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0 ∧  p_718) -> (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧ -b^{2, 360}_0)
c  in CNF:
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_2
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_1
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_0
c  in DIMACS:
-5723  5724 -5725 -718 -5726 0
-5723  5724 -5725 -718 -5727 0
-5723  5724 -5725 -718 -5728 0

c  0+1 --> 1
c    (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧  p_718) -> (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0)
c  in CNF:
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_2
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_1
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨  b^{2, 360}_0
c  in DIMACS:
 5723  5724  5725 -718 -5726 0
 5723  5724  5725 -718 -5727 0
 5723  5724  5725 -718  5728 0

c  1+1 --> 2
c    (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0 ∧  p_718) -> (-b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0)
c  in CNF:
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_2
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨  b^{2, 360}_1
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ -p_718 ∨ -b^{2, 360}_0
c  in DIMACS:
 5723  5724 -5725 -718 -5726 0
 5723  5724 -5725 -718  5727 0
 5723  5724 -5725 -718 -5728 0

c  2+1 --> break 
c    (-b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧  p_718) -> break
c  in CNF:
c     b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ -p_718 ∨ break
c  in DIMACS:
 5723 -5724  5725 -718 1162 0


c  2-1 --> 1
c    (-b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧ -p_718) -> (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0)
c  in CNF:
c     b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_2
c     b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_1
c     b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨  b^{2, 360}_0
c  in DIMACS:
 5723 -5724  5725  718 -5726 0
 5723 -5724  5725  718 -5727 0
 5723 -5724  5725  718  5728 0

c  1-1 --> 0
c    (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0 ∧ -p_718) -> (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧ -b^{2, 360}_0)
c  in CNF:
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_2
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_1
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_0
c  in DIMACS:
 5723  5724 -5725  718 -5726 0
 5723  5724 -5725  718 -5727 0
 5723  5724 -5725  718 -5728 0

c  0-1 --> -1
c    (-b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧ -p_718) -> ( b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0)
c  in CNF:
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨  b^{2, 360}_2
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_1
c     b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨  b^{2, 360}_0
c  in DIMACS:
 5723  5724  5725  718  5726 0
 5723  5724  5725  718 -5727 0
 5723  5724  5725  718  5728 0

c  -1-1 --> -2
c    ( b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧  b^{2, 359}_0 ∧ -p_718) -> ( b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0)
c  in CNF:
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨  b^{2, 360}_2
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨  b^{2, 360}_1
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨  p_718 ∨ -b^{2, 360}_0
c  in DIMACS:
-5723  5724 -5725  718  5726 0
-5723  5724 -5725  718  5727 0
-5723  5724 -5725  718 -5728 0

c  -2-1 --> break 
c    ( b^{2, 359}_2 ∧  b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧ -p_718) -> break
c  in CNF:
c    -b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨  b^{2, 359}_0 ∨  p_718 ∨ break
c  in DIMACS:
-5723 -5724  5725  718 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 359}_2 ∧ -b^{2, 359}_1 ∧ -b^{2, 359}_0 ∧ true) 
c  in CNF:
c    -b^{2, 359}_2 ∨  b^{2, 359}_1 ∨  b^{2, 359}_0 ∨ false 
c  in DIMACS:
-5723  5724  5725  0

c  3 does not represent an automaton state.
c    -(-b^{2, 359}_2 ∧  b^{2, 359}_1 ∧  b^{2, 359}_0 ∧ true) 
c  in CNF:
c     b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ false 
c  in DIMACS:
 5723 -5724 -5725  0
c  -3 does not represent an automaton state.
c    -( b^{2, 359}_2 ∧  b^{2, 359}_1 ∧  b^{2, 359}_0 ∧ true) 
c  in CNF:
c    -b^{2, 359}_2 ∨ -b^{2, 359}_1 ∨ -b^{2, 359}_0 ∨ false 
c  in DIMACS:
-5723 -5724 -5725  0

c i = 360
c  -2+1 --> -1
c    ( b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧  p_720) -> ( b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0)
c  in CNF:
c    -b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨  b^{2, 361}_2
c    -b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_1
c    -b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨  b^{2, 361}_0
c  in DIMACS:
-5726 -5727  5728 -720  5729 0
-5726 -5727  5728 -720 -5730 0
-5726 -5727  5728 -720  5731 0

c  -1+1 --> 0
c    ( b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0 ∧  p_720) -> (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧ -b^{2, 361}_0)
c  in CNF:
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_2
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_1
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_0
c  in DIMACS:
-5726  5727 -5728 -720 -5729 0
-5726  5727 -5728 -720 -5730 0
-5726  5727 -5728 -720 -5731 0

c  0+1 --> 1
c    (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧  p_720) -> (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0)
c  in CNF:
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_2
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_1
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨  b^{2, 361}_0
c  in DIMACS:
 5726  5727  5728 -720 -5729 0
 5726  5727  5728 -720 -5730 0
 5726  5727  5728 -720  5731 0

c  1+1 --> 2
c    (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0 ∧  p_720) -> (-b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0)
c  in CNF:
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_2
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨  b^{2, 361}_1
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ -p_720 ∨ -b^{2, 361}_0
c  in DIMACS:
 5726  5727 -5728 -720 -5729 0
 5726  5727 -5728 -720  5730 0
 5726  5727 -5728 -720 -5731 0

c  2+1 --> break 
c    (-b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧  p_720) -> break
c  in CNF:
c     b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 5726 -5727  5728 -720 1162 0


c  2-1 --> 1
c    (-b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧ -p_720) -> (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0)
c  in CNF:
c     b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_2
c     b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_1
c     b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨  b^{2, 361}_0
c  in DIMACS:
 5726 -5727  5728  720 -5729 0
 5726 -5727  5728  720 -5730 0
 5726 -5727  5728  720  5731 0

c  1-1 --> 0
c    (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0 ∧ -p_720) -> (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧ -b^{2, 361}_0)
c  in CNF:
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_2
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_1
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_0
c  in DIMACS:
 5726  5727 -5728  720 -5729 0
 5726  5727 -5728  720 -5730 0
 5726  5727 -5728  720 -5731 0

c  0-1 --> -1
c    (-b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧ -p_720) -> ( b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0)
c  in CNF:
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨  b^{2, 361}_2
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_1
c     b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨  b^{2, 361}_0
c  in DIMACS:
 5726  5727  5728  720  5729 0
 5726  5727  5728  720 -5730 0
 5726  5727  5728  720  5731 0

c  -1-1 --> -2
c    ( b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧  b^{2, 360}_0 ∧ -p_720) -> ( b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0)
c  in CNF:
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨  b^{2, 361}_2
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨  b^{2, 361}_1
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨  p_720 ∨ -b^{2, 361}_0
c  in DIMACS:
-5726  5727 -5728  720  5729 0
-5726  5727 -5728  720  5730 0
-5726  5727 -5728  720 -5731 0

c  -2-1 --> break 
c    ( b^{2, 360}_2 ∧  b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨  b^{2, 360}_0 ∨  p_720 ∨ break
c  in DIMACS:
-5726 -5727  5728  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 360}_2 ∧ -b^{2, 360}_1 ∧ -b^{2, 360}_0 ∧ true) 
c  in CNF:
c    -b^{2, 360}_2 ∨  b^{2, 360}_1 ∨  b^{2, 360}_0 ∨ false 
c  in DIMACS:
-5726  5727  5728  0

c  3 does not represent an automaton state.
c    -(-b^{2, 360}_2 ∧  b^{2, 360}_1 ∧  b^{2, 360}_0 ∧ true) 
c  in CNF:
c     b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ false 
c  in DIMACS:
 5726 -5727 -5728  0
c  -3 does not represent an automaton state.
c    -( b^{2, 360}_2 ∧  b^{2, 360}_1 ∧  b^{2, 360}_0 ∧ true) 
c  in CNF:
c    -b^{2, 360}_2 ∨ -b^{2, 360}_1 ∨ -b^{2, 360}_0 ∨ false 
c  in DIMACS:
-5726 -5727 -5728  0

c i = 361
c  -2+1 --> -1
c    ( b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧  p_722) -> ( b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0)
c  in CNF:
c    -b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨  b^{2, 362}_2
c    -b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_1
c    -b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨  b^{2, 362}_0
c  in DIMACS:
-5729 -5730  5731 -722  5732 0
-5729 -5730  5731 -722 -5733 0
-5729 -5730  5731 -722  5734 0

c  -1+1 --> 0
c    ( b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0 ∧  p_722) -> (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧ -b^{2, 362}_0)
c  in CNF:
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_2
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_1
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_0
c  in DIMACS:
-5729  5730 -5731 -722 -5732 0
-5729  5730 -5731 -722 -5733 0
-5729  5730 -5731 -722 -5734 0

c  0+1 --> 1
c    (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧  p_722) -> (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0)
c  in CNF:
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_2
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_1
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨  b^{2, 362}_0
c  in DIMACS:
 5729  5730  5731 -722 -5732 0
 5729  5730  5731 -722 -5733 0
 5729  5730  5731 -722  5734 0

c  1+1 --> 2
c    (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0 ∧  p_722) -> (-b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0)
c  in CNF:
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_2
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨  b^{2, 362}_1
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ -p_722 ∨ -b^{2, 362}_0
c  in DIMACS:
 5729  5730 -5731 -722 -5732 0
 5729  5730 -5731 -722  5733 0
 5729  5730 -5731 -722 -5734 0

c  2+1 --> break 
c    (-b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧  p_722) -> break
c  in CNF:
c     b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ -p_722 ∨ break
c  in DIMACS:
 5729 -5730  5731 -722 1162 0


c  2-1 --> 1
c    (-b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧ -p_722) -> (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0)
c  in CNF:
c     b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_2
c     b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_1
c     b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨  b^{2, 362}_0
c  in DIMACS:
 5729 -5730  5731  722 -5732 0
 5729 -5730  5731  722 -5733 0
 5729 -5730  5731  722  5734 0

c  1-1 --> 0
c    (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0 ∧ -p_722) -> (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧ -b^{2, 362}_0)
c  in CNF:
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_2
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_1
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_0
c  in DIMACS:
 5729  5730 -5731  722 -5732 0
 5729  5730 -5731  722 -5733 0
 5729  5730 -5731  722 -5734 0

c  0-1 --> -1
c    (-b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧ -p_722) -> ( b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0)
c  in CNF:
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨  b^{2, 362}_2
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_1
c     b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨  b^{2, 362}_0
c  in DIMACS:
 5729  5730  5731  722  5732 0
 5729  5730  5731  722 -5733 0
 5729  5730  5731  722  5734 0

c  -1-1 --> -2
c    ( b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧  b^{2, 361}_0 ∧ -p_722) -> ( b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0)
c  in CNF:
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨  b^{2, 362}_2
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨  b^{2, 362}_1
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨  p_722 ∨ -b^{2, 362}_0
c  in DIMACS:
-5729  5730 -5731  722  5732 0
-5729  5730 -5731  722  5733 0
-5729  5730 -5731  722 -5734 0

c  -2-1 --> break 
c    ( b^{2, 361}_2 ∧  b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧ -p_722) -> break
c  in CNF:
c    -b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨  b^{2, 361}_0 ∨  p_722 ∨ break
c  in DIMACS:
-5729 -5730  5731  722 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 361}_2 ∧ -b^{2, 361}_1 ∧ -b^{2, 361}_0 ∧ true) 
c  in CNF:
c    -b^{2, 361}_2 ∨  b^{2, 361}_1 ∨  b^{2, 361}_0 ∨ false 
c  in DIMACS:
-5729  5730  5731  0

c  3 does not represent an automaton state.
c    -(-b^{2, 361}_2 ∧  b^{2, 361}_1 ∧  b^{2, 361}_0 ∧ true) 
c  in CNF:
c     b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ false 
c  in DIMACS:
 5729 -5730 -5731  0
c  -3 does not represent an automaton state.
c    -( b^{2, 361}_2 ∧  b^{2, 361}_1 ∧  b^{2, 361}_0 ∧ true) 
c  in CNF:
c    -b^{2, 361}_2 ∨ -b^{2, 361}_1 ∨ -b^{2, 361}_0 ∨ false 
c  in DIMACS:
-5729 -5730 -5731  0

c i = 362
c  -2+1 --> -1
c    ( b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧  p_724) -> ( b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0)
c  in CNF:
c    -b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨  b^{2, 363}_2
c    -b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_1
c    -b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨  b^{2, 363}_0
c  in DIMACS:
-5732 -5733  5734 -724  5735 0
-5732 -5733  5734 -724 -5736 0
-5732 -5733  5734 -724  5737 0

c  -1+1 --> 0
c    ( b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0 ∧  p_724) -> (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧ -b^{2, 363}_0)
c  in CNF:
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_2
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_1
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_0
c  in DIMACS:
-5732  5733 -5734 -724 -5735 0
-5732  5733 -5734 -724 -5736 0
-5732  5733 -5734 -724 -5737 0

c  0+1 --> 1
c    (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧  p_724) -> (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0)
c  in CNF:
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_2
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_1
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨  b^{2, 363}_0
c  in DIMACS:
 5732  5733  5734 -724 -5735 0
 5732  5733  5734 -724 -5736 0
 5732  5733  5734 -724  5737 0

c  1+1 --> 2
c    (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0 ∧  p_724) -> (-b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0)
c  in CNF:
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_2
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨  b^{2, 363}_1
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ -p_724 ∨ -b^{2, 363}_0
c  in DIMACS:
 5732  5733 -5734 -724 -5735 0
 5732  5733 -5734 -724  5736 0
 5732  5733 -5734 -724 -5737 0

c  2+1 --> break 
c    (-b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧  p_724) -> break
c  in CNF:
c     b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ -p_724 ∨ break
c  in DIMACS:
 5732 -5733  5734 -724 1162 0


c  2-1 --> 1
c    (-b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧ -p_724) -> (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0)
c  in CNF:
c     b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_2
c     b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_1
c     b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨  b^{2, 363}_0
c  in DIMACS:
 5732 -5733  5734  724 -5735 0
 5732 -5733  5734  724 -5736 0
 5732 -5733  5734  724  5737 0

c  1-1 --> 0
c    (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0 ∧ -p_724) -> (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧ -b^{2, 363}_0)
c  in CNF:
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_2
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_1
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_0
c  in DIMACS:
 5732  5733 -5734  724 -5735 0
 5732  5733 -5734  724 -5736 0
 5732  5733 -5734  724 -5737 0

c  0-1 --> -1
c    (-b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧ -p_724) -> ( b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0)
c  in CNF:
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨  b^{2, 363}_2
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_1
c     b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨  b^{2, 363}_0
c  in DIMACS:
 5732  5733  5734  724  5735 0
 5732  5733  5734  724 -5736 0
 5732  5733  5734  724  5737 0

c  -1-1 --> -2
c    ( b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧  b^{2, 362}_0 ∧ -p_724) -> ( b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0)
c  in CNF:
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨  b^{2, 363}_2
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨  b^{2, 363}_1
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨  p_724 ∨ -b^{2, 363}_0
c  in DIMACS:
-5732  5733 -5734  724  5735 0
-5732  5733 -5734  724  5736 0
-5732  5733 -5734  724 -5737 0

c  -2-1 --> break 
c    ( b^{2, 362}_2 ∧  b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧ -p_724) -> break
c  in CNF:
c    -b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨  b^{2, 362}_0 ∨  p_724 ∨ break
c  in DIMACS:
-5732 -5733  5734  724 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 362}_2 ∧ -b^{2, 362}_1 ∧ -b^{2, 362}_0 ∧ true) 
c  in CNF:
c    -b^{2, 362}_2 ∨  b^{2, 362}_1 ∨  b^{2, 362}_0 ∨ false 
c  in DIMACS:
-5732  5733  5734  0

c  3 does not represent an automaton state.
c    -(-b^{2, 362}_2 ∧  b^{2, 362}_1 ∧  b^{2, 362}_0 ∧ true) 
c  in CNF:
c     b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ false 
c  in DIMACS:
 5732 -5733 -5734  0
c  -3 does not represent an automaton state.
c    -( b^{2, 362}_2 ∧  b^{2, 362}_1 ∧  b^{2, 362}_0 ∧ true) 
c  in CNF:
c    -b^{2, 362}_2 ∨ -b^{2, 362}_1 ∨ -b^{2, 362}_0 ∨ false 
c  in DIMACS:
-5732 -5733 -5734  0

c i = 363
c  -2+1 --> -1
c    ( b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧  p_726) -> ( b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0)
c  in CNF:
c    -b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨  b^{2, 364}_2
c    -b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_1
c    -b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨  b^{2, 364}_0
c  in DIMACS:
-5735 -5736  5737 -726  5738 0
-5735 -5736  5737 -726 -5739 0
-5735 -5736  5737 -726  5740 0

c  -1+1 --> 0
c    ( b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0 ∧  p_726) -> (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧ -b^{2, 364}_0)
c  in CNF:
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_2
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_1
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_0
c  in DIMACS:
-5735  5736 -5737 -726 -5738 0
-5735  5736 -5737 -726 -5739 0
-5735  5736 -5737 -726 -5740 0

c  0+1 --> 1
c    (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧  p_726) -> (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0)
c  in CNF:
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_2
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_1
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨  b^{2, 364}_0
c  in DIMACS:
 5735  5736  5737 -726 -5738 0
 5735  5736  5737 -726 -5739 0
 5735  5736  5737 -726  5740 0

c  1+1 --> 2
c    (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0 ∧  p_726) -> (-b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0)
c  in CNF:
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_2
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨  b^{2, 364}_1
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ -p_726 ∨ -b^{2, 364}_0
c  in DIMACS:
 5735  5736 -5737 -726 -5738 0
 5735  5736 -5737 -726  5739 0
 5735  5736 -5737 -726 -5740 0

c  2+1 --> break 
c    (-b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧  p_726) -> break
c  in CNF:
c     b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 5735 -5736  5737 -726 1162 0


c  2-1 --> 1
c    (-b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧ -p_726) -> (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0)
c  in CNF:
c     b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_2
c     b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_1
c     b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨  b^{2, 364}_0
c  in DIMACS:
 5735 -5736  5737  726 -5738 0
 5735 -5736  5737  726 -5739 0
 5735 -5736  5737  726  5740 0

c  1-1 --> 0
c    (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0 ∧ -p_726) -> (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧ -b^{2, 364}_0)
c  in CNF:
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_2
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_1
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_0
c  in DIMACS:
 5735  5736 -5737  726 -5738 0
 5735  5736 -5737  726 -5739 0
 5735  5736 -5737  726 -5740 0

c  0-1 --> -1
c    (-b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧ -p_726) -> ( b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0)
c  in CNF:
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨  b^{2, 364}_2
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_1
c     b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨  b^{2, 364}_0
c  in DIMACS:
 5735  5736  5737  726  5738 0
 5735  5736  5737  726 -5739 0
 5735  5736  5737  726  5740 0

c  -1-1 --> -2
c    ( b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧  b^{2, 363}_0 ∧ -p_726) -> ( b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0)
c  in CNF:
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨  b^{2, 364}_2
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨  b^{2, 364}_1
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨  p_726 ∨ -b^{2, 364}_0
c  in DIMACS:
-5735  5736 -5737  726  5738 0
-5735  5736 -5737  726  5739 0
-5735  5736 -5737  726 -5740 0

c  -2-1 --> break 
c    ( b^{2, 363}_2 ∧  b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨  b^{2, 363}_0 ∨  p_726 ∨ break
c  in DIMACS:
-5735 -5736  5737  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 363}_2 ∧ -b^{2, 363}_1 ∧ -b^{2, 363}_0 ∧ true) 
c  in CNF:
c    -b^{2, 363}_2 ∨  b^{2, 363}_1 ∨  b^{2, 363}_0 ∨ false 
c  in DIMACS:
-5735  5736  5737  0

c  3 does not represent an automaton state.
c    -(-b^{2, 363}_2 ∧  b^{2, 363}_1 ∧  b^{2, 363}_0 ∧ true) 
c  in CNF:
c     b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ false 
c  in DIMACS:
 5735 -5736 -5737  0
c  -3 does not represent an automaton state.
c    -( b^{2, 363}_2 ∧  b^{2, 363}_1 ∧  b^{2, 363}_0 ∧ true) 
c  in CNF:
c    -b^{2, 363}_2 ∨ -b^{2, 363}_1 ∨ -b^{2, 363}_0 ∨ false 
c  in DIMACS:
-5735 -5736 -5737  0

c i = 364
c  -2+1 --> -1
c    ( b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧  p_728) -> ( b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0)
c  in CNF:
c    -b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨  b^{2, 365}_2
c    -b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_1
c    -b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨  b^{2, 365}_0
c  in DIMACS:
-5738 -5739  5740 -728  5741 0
-5738 -5739  5740 -728 -5742 0
-5738 -5739  5740 -728  5743 0

c  -1+1 --> 0
c    ( b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0 ∧  p_728) -> (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧ -b^{2, 365}_0)
c  in CNF:
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_2
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_1
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_0
c  in DIMACS:
-5738  5739 -5740 -728 -5741 0
-5738  5739 -5740 -728 -5742 0
-5738  5739 -5740 -728 -5743 0

c  0+1 --> 1
c    (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧  p_728) -> (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0)
c  in CNF:
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_2
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_1
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨  b^{2, 365}_0
c  in DIMACS:
 5738  5739  5740 -728 -5741 0
 5738  5739  5740 -728 -5742 0
 5738  5739  5740 -728  5743 0

c  1+1 --> 2
c    (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0 ∧  p_728) -> (-b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0)
c  in CNF:
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_2
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨  b^{2, 365}_1
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ -p_728 ∨ -b^{2, 365}_0
c  in DIMACS:
 5738  5739 -5740 -728 -5741 0
 5738  5739 -5740 -728  5742 0
 5738  5739 -5740 -728 -5743 0

c  2+1 --> break 
c    (-b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧  p_728) -> break
c  in CNF:
c     b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 5738 -5739  5740 -728 1162 0


c  2-1 --> 1
c    (-b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧ -p_728) -> (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0)
c  in CNF:
c     b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_2
c     b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_1
c     b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨  b^{2, 365}_0
c  in DIMACS:
 5738 -5739  5740  728 -5741 0
 5738 -5739  5740  728 -5742 0
 5738 -5739  5740  728  5743 0

c  1-1 --> 0
c    (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0 ∧ -p_728) -> (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧ -b^{2, 365}_0)
c  in CNF:
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_2
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_1
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_0
c  in DIMACS:
 5738  5739 -5740  728 -5741 0
 5738  5739 -5740  728 -5742 0
 5738  5739 -5740  728 -5743 0

c  0-1 --> -1
c    (-b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧ -p_728) -> ( b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0)
c  in CNF:
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨  b^{2, 365}_2
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_1
c     b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨  b^{2, 365}_0
c  in DIMACS:
 5738  5739  5740  728  5741 0
 5738  5739  5740  728 -5742 0
 5738  5739  5740  728  5743 0

c  -1-1 --> -2
c    ( b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧  b^{2, 364}_0 ∧ -p_728) -> ( b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0)
c  in CNF:
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨  b^{2, 365}_2
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨  b^{2, 365}_1
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨  p_728 ∨ -b^{2, 365}_0
c  in DIMACS:
-5738  5739 -5740  728  5741 0
-5738  5739 -5740  728  5742 0
-5738  5739 -5740  728 -5743 0

c  -2-1 --> break 
c    ( b^{2, 364}_2 ∧  b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨  b^{2, 364}_0 ∨  p_728 ∨ break
c  in DIMACS:
-5738 -5739  5740  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 364}_2 ∧ -b^{2, 364}_1 ∧ -b^{2, 364}_0 ∧ true) 
c  in CNF:
c    -b^{2, 364}_2 ∨  b^{2, 364}_1 ∨  b^{2, 364}_0 ∨ false 
c  in DIMACS:
-5738  5739  5740  0

c  3 does not represent an automaton state.
c    -(-b^{2, 364}_2 ∧  b^{2, 364}_1 ∧  b^{2, 364}_0 ∧ true) 
c  in CNF:
c     b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ false 
c  in DIMACS:
 5738 -5739 -5740  0
c  -3 does not represent an automaton state.
c    -( b^{2, 364}_2 ∧  b^{2, 364}_1 ∧  b^{2, 364}_0 ∧ true) 
c  in CNF:
c    -b^{2, 364}_2 ∨ -b^{2, 364}_1 ∨ -b^{2, 364}_0 ∨ false 
c  in DIMACS:
-5738 -5739 -5740  0

c i = 365
c  -2+1 --> -1
c    ( b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧  p_730) -> ( b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0)
c  in CNF:
c    -b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨  b^{2, 366}_2
c    -b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_1
c    -b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨  b^{2, 366}_0
c  in DIMACS:
-5741 -5742  5743 -730  5744 0
-5741 -5742  5743 -730 -5745 0
-5741 -5742  5743 -730  5746 0

c  -1+1 --> 0
c    ( b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0 ∧  p_730) -> (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧ -b^{2, 366}_0)
c  in CNF:
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_2
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_1
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_0
c  in DIMACS:
-5741  5742 -5743 -730 -5744 0
-5741  5742 -5743 -730 -5745 0
-5741  5742 -5743 -730 -5746 0

c  0+1 --> 1
c    (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧  p_730) -> (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0)
c  in CNF:
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_2
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_1
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨  b^{2, 366}_0
c  in DIMACS:
 5741  5742  5743 -730 -5744 0
 5741  5742  5743 -730 -5745 0
 5741  5742  5743 -730  5746 0

c  1+1 --> 2
c    (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0 ∧  p_730) -> (-b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0)
c  in CNF:
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_2
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨  b^{2, 366}_1
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ -p_730 ∨ -b^{2, 366}_0
c  in DIMACS:
 5741  5742 -5743 -730 -5744 0
 5741  5742 -5743 -730  5745 0
 5741  5742 -5743 -730 -5746 0

c  2+1 --> break 
c    (-b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧  p_730) -> break
c  in CNF:
c     b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 5741 -5742  5743 -730 1162 0


c  2-1 --> 1
c    (-b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧ -p_730) -> (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0)
c  in CNF:
c     b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_2
c     b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_1
c     b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨  b^{2, 366}_0
c  in DIMACS:
 5741 -5742  5743  730 -5744 0
 5741 -5742  5743  730 -5745 0
 5741 -5742  5743  730  5746 0

c  1-1 --> 0
c    (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0 ∧ -p_730) -> (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧ -b^{2, 366}_0)
c  in CNF:
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_2
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_1
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_0
c  in DIMACS:
 5741  5742 -5743  730 -5744 0
 5741  5742 -5743  730 -5745 0
 5741  5742 -5743  730 -5746 0

c  0-1 --> -1
c    (-b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧ -p_730) -> ( b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0)
c  in CNF:
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨  b^{2, 366}_2
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_1
c     b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨  b^{2, 366}_0
c  in DIMACS:
 5741  5742  5743  730  5744 0
 5741  5742  5743  730 -5745 0
 5741  5742  5743  730  5746 0

c  -1-1 --> -2
c    ( b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧  b^{2, 365}_0 ∧ -p_730) -> ( b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0)
c  in CNF:
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨  b^{2, 366}_2
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨  b^{2, 366}_1
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨  p_730 ∨ -b^{2, 366}_0
c  in DIMACS:
-5741  5742 -5743  730  5744 0
-5741  5742 -5743  730  5745 0
-5741  5742 -5743  730 -5746 0

c  -2-1 --> break 
c    ( b^{2, 365}_2 ∧  b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨  b^{2, 365}_0 ∨  p_730 ∨ break
c  in DIMACS:
-5741 -5742  5743  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 365}_2 ∧ -b^{2, 365}_1 ∧ -b^{2, 365}_0 ∧ true) 
c  in CNF:
c    -b^{2, 365}_2 ∨  b^{2, 365}_1 ∨  b^{2, 365}_0 ∨ false 
c  in DIMACS:
-5741  5742  5743  0

c  3 does not represent an automaton state.
c    -(-b^{2, 365}_2 ∧  b^{2, 365}_1 ∧  b^{2, 365}_0 ∧ true) 
c  in CNF:
c     b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ false 
c  in DIMACS:
 5741 -5742 -5743  0
c  -3 does not represent an automaton state.
c    -( b^{2, 365}_2 ∧  b^{2, 365}_1 ∧  b^{2, 365}_0 ∧ true) 
c  in CNF:
c    -b^{2, 365}_2 ∨ -b^{2, 365}_1 ∨ -b^{2, 365}_0 ∨ false 
c  in DIMACS:
-5741 -5742 -5743  0

c i = 366
c  -2+1 --> -1
c    ( b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧  p_732) -> ( b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0)
c  in CNF:
c    -b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨  b^{2, 367}_2
c    -b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_1
c    -b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨  b^{2, 367}_0
c  in DIMACS:
-5744 -5745  5746 -732  5747 0
-5744 -5745  5746 -732 -5748 0
-5744 -5745  5746 -732  5749 0

c  -1+1 --> 0
c    ( b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0 ∧  p_732) -> (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧ -b^{2, 367}_0)
c  in CNF:
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_2
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_1
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_0
c  in DIMACS:
-5744  5745 -5746 -732 -5747 0
-5744  5745 -5746 -732 -5748 0
-5744  5745 -5746 -732 -5749 0

c  0+1 --> 1
c    (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧  p_732) -> (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0)
c  in CNF:
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_2
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_1
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨  b^{2, 367}_0
c  in DIMACS:
 5744  5745  5746 -732 -5747 0
 5744  5745  5746 -732 -5748 0
 5744  5745  5746 -732  5749 0

c  1+1 --> 2
c    (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0 ∧  p_732) -> (-b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0)
c  in CNF:
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_2
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨  b^{2, 367}_1
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ -p_732 ∨ -b^{2, 367}_0
c  in DIMACS:
 5744  5745 -5746 -732 -5747 0
 5744  5745 -5746 -732  5748 0
 5744  5745 -5746 -732 -5749 0

c  2+1 --> break 
c    (-b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧  p_732) -> break
c  in CNF:
c     b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 5744 -5745  5746 -732 1162 0


c  2-1 --> 1
c    (-b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧ -p_732) -> (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0)
c  in CNF:
c     b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_2
c     b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_1
c     b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨  b^{2, 367}_0
c  in DIMACS:
 5744 -5745  5746  732 -5747 0
 5744 -5745  5746  732 -5748 0
 5744 -5745  5746  732  5749 0

c  1-1 --> 0
c    (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0 ∧ -p_732) -> (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧ -b^{2, 367}_0)
c  in CNF:
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_2
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_1
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_0
c  in DIMACS:
 5744  5745 -5746  732 -5747 0
 5744  5745 -5746  732 -5748 0
 5744  5745 -5746  732 -5749 0

c  0-1 --> -1
c    (-b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧ -p_732) -> ( b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0)
c  in CNF:
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨  b^{2, 367}_2
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_1
c     b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨  b^{2, 367}_0
c  in DIMACS:
 5744  5745  5746  732  5747 0
 5744  5745  5746  732 -5748 0
 5744  5745  5746  732  5749 0

c  -1-1 --> -2
c    ( b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧  b^{2, 366}_0 ∧ -p_732) -> ( b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0)
c  in CNF:
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨  b^{2, 367}_2
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨  b^{2, 367}_1
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨  p_732 ∨ -b^{2, 367}_0
c  in DIMACS:
-5744  5745 -5746  732  5747 0
-5744  5745 -5746  732  5748 0
-5744  5745 -5746  732 -5749 0

c  -2-1 --> break 
c    ( b^{2, 366}_2 ∧  b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨  b^{2, 366}_0 ∨  p_732 ∨ break
c  in DIMACS:
-5744 -5745  5746  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 366}_2 ∧ -b^{2, 366}_1 ∧ -b^{2, 366}_0 ∧ true) 
c  in CNF:
c    -b^{2, 366}_2 ∨  b^{2, 366}_1 ∨  b^{2, 366}_0 ∨ false 
c  in DIMACS:
-5744  5745  5746  0

c  3 does not represent an automaton state.
c    -(-b^{2, 366}_2 ∧  b^{2, 366}_1 ∧  b^{2, 366}_0 ∧ true) 
c  in CNF:
c     b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ false 
c  in DIMACS:
 5744 -5745 -5746  0
c  -3 does not represent an automaton state.
c    -( b^{2, 366}_2 ∧  b^{2, 366}_1 ∧  b^{2, 366}_0 ∧ true) 
c  in CNF:
c    -b^{2, 366}_2 ∨ -b^{2, 366}_1 ∨ -b^{2, 366}_0 ∨ false 
c  in DIMACS:
-5744 -5745 -5746  0

c i = 367
c  -2+1 --> -1
c    ( b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧  p_734) -> ( b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0)
c  in CNF:
c    -b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨  b^{2, 368}_2
c    -b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_1
c    -b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨  b^{2, 368}_0
c  in DIMACS:
-5747 -5748  5749 -734  5750 0
-5747 -5748  5749 -734 -5751 0
-5747 -5748  5749 -734  5752 0

c  -1+1 --> 0
c    ( b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0 ∧  p_734) -> (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧ -b^{2, 368}_0)
c  in CNF:
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_2
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_1
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_0
c  in DIMACS:
-5747  5748 -5749 -734 -5750 0
-5747  5748 -5749 -734 -5751 0
-5747  5748 -5749 -734 -5752 0

c  0+1 --> 1
c    (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧  p_734) -> (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0)
c  in CNF:
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_2
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_1
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨  b^{2, 368}_0
c  in DIMACS:
 5747  5748  5749 -734 -5750 0
 5747  5748  5749 -734 -5751 0
 5747  5748  5749 -734  5752 0

c  1+1 --> 2
c    (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0 ∧  p_734) -> (-b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0)
c  in CNF:
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_2
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨  b^{2, 368}_1
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ -p_734 ∨ -b^{2, 368}_0
c  in DIMACS:
 5747  5748 -5749 -734 -5750 0
 5747  5748 -5749 -734  5751 0
 5747  5748 -5749 -734 -5752 0

c  2+1 --> break 
c    (-b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧  p_734) -> break
c  in CNF:
c     b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ -p_734 ∨ break
c  in DIMACS:
 5747 -5748  5749 -734 1162 0


c  2-1 --> 1
c    (-b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧ -p_734) -> (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0)
c  in CNF:
c     b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_2
c     b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_1
c     b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨  b^{2, 368}_0
c  in DIMACS:
 5747 -5748  5749  734 -5750 0
 5747 -5748  5749  734 -5751 0
 5747 -5748  5749  734  5752 0

c  1-1 --> 0
c    (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0 ∧ -p_734) -> (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧ -b^{2, 368}_0)
c  in CNF:
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_2
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_1
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_0
c  in DIMACS:
 5747  5748 -5749  734 -5750 0
 5747  5748 -5749  734 -5751 0
 5747  5748 -5749  734 -5752 0

c  0-1 --> -1
c    (-b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧ -p_734) -> ( b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0)
c  in CNF:
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨  b^{2, 368}_2
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_1
c     b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨  b^{2, 368}_0
c  in DIMACS:
 5747  5748  5749  734  5750 0
 5747  5748  5749  734 -5751 0
 5747  5748  5749  734  5752 0

c  -1-1 --> -2
c    ( b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧  b^{2, 367}_0 ∧ -p_734) -> ( b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0)
c  in CNF:
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨  b^{2, 368}_2
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨  b^{2, 368}_1
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨  p_734 ∨ -b^{2, 368}_0
c  in DIMACS:
-5747  5748 -5749  734  5750 0
-5747  5748 -5749  734  5751 0
-5747  5748 -5749  734 -5752 0

c  -2-1 --> break 
c    ( b^{2, 367}_2 ∧  b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧ -p_734) -> break
c  in CNF:
c    -b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨  b^{2, 367}_0 ∨  p_734 ∨ break
c  in DIMACS:
-5747 -5748  5749  734 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 367}_2 ∧ -b^{2, 367}_1 ∧ -b^{2, 367}_0 ∧ true) 
c  in CNF:
c    -b^{2, 367}_2 ∨  b^{2, 367}_1 ∨  b^{2, 367}_0 ∨ false 
c  in DIMACS:
-5747  5748  5749  0

c  3 does not represent an automaton state.
c    -(-b^{2, 367}_2 ∧  b^{2, 367}_1 ∧  b^{2, 367}_0 ∧ true) 
c  in CNF:
c     b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ false 
c  in DIMACS:
 5747 -5748 -5749  0
c  -3 does not represent an automaton state.
c    -( b^{2, 367}_2 ∧  b^{2, 367}_1 ∧  b^{2, 367}_0 ∧ true) 
c  in CNF:
c    -b^{2, 367}_2 ∨ -b^{2, 367}_1 ∨ -b^{2, 367}_0 ∨ false 
c  in DIMACS:
-5747 -5748 -5749  0

c i = 368
c  -2+1 --> -1
c    ( b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧  p_736) -> ( b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0)
c  in CNF:
c    -b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨  b^{2, 369}_2
c    -b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_1
c    -b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨  b^{2, 369}_0
c  in DIMACS:
-5750 -5751  5752 -736  5753 0
-5750 -5751  5752 -736 -5754 0
-5750 -5751  5752 -736  5755 0

c  -1+1 --> 0
c    ( b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0 ∧  p_736) -> (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧ -b^{2, 369}_0)
c  in CNF:
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_2
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_1
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_0
c  in DIMACS:
-5750  5751 -5752 -736 -5753 0
-5750  5751 -5752 -736 -5754 0
-5750  5751 -5752 -736 -5755 0

c  0+1 --> 1
c    (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧  p_736) -> (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0)
c  in CNF:
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_2
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_1
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨  b^{2, 369}_0
c  in DIMACS:
 5750  5751  5752 -736 -5753 0
 5750  5751  5752 -736 -5754 0
 5750  5751  5752 -736  5755 0

c  1+1 --> 2
c    (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0 ∧  p_736) -> (-b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0)
c  in CNF:
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_2
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨  b^{2, 369}_1
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ -p_736 ∨ -b^{2, 369}_0
c  in DIMACS:
 5750  5751 -5752 -736 -5753 0
 5750  5751 -5752 -736  5754 0
 5750  5751 -5752 -736 -5755 0

c  2+1 --> break 
c    (-b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧  p_736) -> break
c  in CNF:
c     b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 5750 -5751  5752 -736 1162 0


c  2-1 --> 1
c    (-b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧ -p_736) -> (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0)
c  in CNF:
c     b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_2
c     b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_1
c     b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨  b^{2, 369}_0
c  in DIMACS:
 5750 -5751  5752  736 -5753 0
 5750 -5751  5752  736 -5754 0
 5750 -5751  5752  736  5755 0

c  1-1 --> 0
c    (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0 ∧ -p_736) -> (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧ -b^{2, 369}_0)
c  in CNF:
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_2
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_1
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_0
c  in DIMACS:
 5750  5751 -5752  736 -5753 0
 5750  5751 -5752  736 -5754 0
 5750  5751 -5752  736 -5755 0

c  0-1 --> -1
c    (-b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧ -p_736) -> ( b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0)
c  in CNF:
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨  b^{2, 369}_2
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_1
c     b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨  b^{2, 369}_0
c  in DIMACS:
 5750  5751  5752  736  5753 0
 5750  5751  5752  736 -5754 0
 5750  5751  5752  736  5755 0

c  -1-1 --> -2
c    ( b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧  b^{2, 368}_0 ∧ -p_736) -> ( b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0)
c  in CNF:
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨  b^{2, 369}_2
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨  b^{2, 369}_1
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨  p_736 ∨ -b^{2, 369}_0
c  in DIMACS:
-5750  5751 -5752  736  5753 0
-5750  5751 -5752  736  5754 0
-5750  5751 -5752  736 -5755 0

c  -2-1 --> break 
c    ( b^{2, 368}_2 ∧  b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨  b^{2, 368}_0 ∨  p_736 ∨ break
c  in DIMACS:
-5750 -5751  5752  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 368}_2 ∧ -b^{2, 368}_1 ∧ -b^{2, 368}_0 ∧ true) 
c  in CNF:
c    -b^{2, 368}_2 ∨  b^{2, 368}_1 ∨  b^{2, 368}_0 ∨ false 
c  in DIMACS:
-5750  5751  5752  0

c  3 does not represent an automaton state.
c    -(-b^{2, 368}_2 ∧  b^{2, 368}_1 ∧  b^{2, 368}_0 ∧ true) 
c  in CNF:
c     b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ false 
c  in DIMACS:
 5750 -5751 -5752  0
c  -3 does not represent an automaton state.
c    -( b^{2, 368}_2 ∧  b^{2, 368}_1 ∧  b^{2, 368}_0 ∧ true) 
c  in CNF:
c    -b^{2, 368}_2 ∨ -b^{2, 368}_1 ∨ -b^{2, 368}_0 ∨ false 
c  in DIMACS:
-5750 -5751 -5752  0

c i = 369
c  -2+1 --> -1
c    ( b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧  p_738) -> ( b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0)
c  in CNF:
c    -b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨  b^{2, 370}_2
c    -b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_1
c    -b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨  b^{2, 370}_0
c  in DIMACS:
-5753 -5754  5755 -738  5756 0
-5753 -5754  5755 -738 -5757 0
-5753 -5754  5755 -738  5758 0

c  -1+1 --> 0
c    ( b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0 ∧  p_738) -> (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧ -b^{2, 370}_0)
c  in CNF:
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_2
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_1
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_0
c  in DIMACS:
-5753  5754 -5755 -738 -5756 0
-5753  5754 -5755 -738 -5757 0
-5753  5754 -5755 -738 -5758 0

c  0+1 --> 1
c    (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧  p_738) -> (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0)
c  in CNF:
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_2
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_1
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨  b^{2, 370}_0
c  in DIMACS:
 5753  5754  5755 -738 -5756 0
 5753  5754  5755 -738 -5757 0
 5753  5754  5755 -738  5758 0

c  1+1 --> 2
c    (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0 ∧  p_738) -> (-b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0)
c  in CNF:
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_2
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨  b^{2, 370}_1
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ -p_738 ∨ -b^{2, 370}_0
c  in DIMACS:
 5753  5754 -5755 -738 -5756 0
 5753  5754 -5755 -738  5757 0
 5753  5754 -5755 -738 -5758 0

c  2+1 --> break 
c    (-b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧  p_738) -> break
c  in CNF:
c     b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 5753 -5754  5755 -738 1162 0


c  2-1 --> 1
c    (-b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧ -p_738) -> (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0)
c  in CNF:
c     b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_2
c     b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_1
c     b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨  b^{2, 370}_0
c  in DIMACS:
 5753 -5754  5755  738 -5756 0
 5753 -5754  5755  738 -5757 0
 5753 -5754  5755  738  5758 0

c  1-1 --> 0
c    (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0 ∧ -p_738) -> (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧ -b^{2, 370}_0)
c  in CNF:
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_2
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_1
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_0
c  in DIMACS:
 5753  5754 -5755  738 -5756 0
 5753  5754 -5755  738 -5757 0
 5753  5754 -5755  738 -5758 0

c  0-1 --> -1
c    (-b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧ -p_738) -> ( b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0)
c  in CNF:
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨  b^{2, 370}_2
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_1
c     b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨  b^{2, 370}_0
c  in DIMACS:
 5753  5754  5755  738  5756 0
 5753  5754  5755  738 -5757 0
 5753  5754  5755  738  5758 0

c  -1-1 --> -2
c    ( b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧  b^{2, 369}_0 ∧ -p_738) -> ( b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0)
c  in CNF:
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨  b^{2, 370}_2
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨  b^{2, 370}_1
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨  p_738 ∨ -b^{2, 370}_0
c  in DIMACS:
-5753  5754 -5755  738  5756 0
-5753  5754 -5755  738  5757 0
-5753  5754 -5755  738 -5758 0

c  -2-1 --> break 
c    ( b^{2, 369}_2 ∧  b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨  b^{2, 369}_0 ∨  p_738 ∨ break
c  in DIMACS:
-5753 -5754  5755  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 369}_2 ∧ -b^{2, 369}_1 ∧ -b^{2, 369}_0 ∧ true) 
c  in CNF:
c    -b^{2, 369}_2 ∨  b^{2, 369}_1 ∨  b^{2, 369}_0 ∨ false 
c  in DIMACS:
-5753  5754  5755  0

c  3 does not represent an automaton state.
c    -(-b^{2, 369}_2 ∧  b^{2, 369}_1 ∧  b^{2, 369}_0 ∧ true) 
c  in CNF:
c     b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ false 
c  in DIMACS:
 5753 -5754 -5755  0
c  -3 does not represent an automaton state.
c    -( b^{2, 369}_2 ∧  b^{2, 369}_1 ∧  b^{2, 369}_0 ∧ true) 
c  in CNF:
c    -b^{2, 369}_2 ∨ -b^{2, 369}_1 ∨ -b^{2, 369}_0 ∨ false 
c  in DIMACS:
-5753 -5754 -5755  0

c i = 370
c  -2+1 --> -1
c    ( b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧  p_740) -> ( b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0)
c  in CNF:
c    -b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨  b^{2, 371}_2
c    -b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_1
c    -b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨  b^{2, 371}_0
c  in DIMACS:
-5756 -5757  5758 -740  5759 0
-5756 -5757  5758 -740 -5760 0
-5756 -5757  5758 -740  5761 0

c  -1+1 --> 0
c    ( b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0 ∧  p_740) -> (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧ -b^{2, 371}_0)
c  in CNF:
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_2
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_1
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_0
c  in DIMACS:
-5756  5757 -5758 -740 -5759 0
-5756  5757 -5758 -740 -5760 0
-5756  5757 -5758 -740 -5761 0

c  0+1 --> 1
c    (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧  p_740) -> (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0)
c  in CNF:
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_2
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_1
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨  b^{2, 371}_0
c  in DIMACS:
 5756  5757  5758 -740 -5759 0
 5756  5757  5758 -740 -5760 0
 5756  5757  5758 -740  5761 0

c  1+1 --> 2
c    (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0 ∧  p_740) -> (-b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0)
c  in CNF:
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_2
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨  b^{2, 371}_1
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ -p_740 ∨ -b^{2, 371}_0
c  in DIMACS:
 5756  5757 -5758 -740 -5759 0
 5756  5757 -5758 -740  5760 0
 5756  5757 -5758 -740 -5761 0

c  2+1 --> break 
c    (-b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧  p_740) -> break
c  in CNF:
c     b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 5756 -5757  5758 -740 1162 0


c  2-1 --> 1
c    (-b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧ -p_740) -> (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0)
c  in CNF:
c     b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_2
c     b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_1
c     b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨  b^{2, 371}_0
c  in DIMACS:
 5756 -5757  5758  740 -5759 0
 5756 -5757  5758  740 -5760 0
 5756 -5757  5758  740  5761 0

c  1-1 --> 0
c    (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0 ∧ -p_740) -> (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧ -b^{2, 371}_0)
c  in CNF:
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_2
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_1
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_0
c  in DIMACS:
 5756  5757 -5758  740 -5759 0
 5756  5757 -5758  740 -5760 0
 5756  5757 -5758  740 -5761 0

c  0-1 --> -1
c    (-b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧ -p_740) -> ( b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0)
c  in CNF:
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨  b^{2, 371}_2
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_1
c     b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨  b^{2, 371}_0
c  in DIMACS:
 5756  5757  5758  740  5759 0
 5756  5757  5758  740 -5760 0
 5756  5757  5758  740  5761 0

c  -1-1 --> -2
c    ( b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧  b^{2, 370}_0 ∧ -p_740) -> ( b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0)
c  in CNF:
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨  b^{2, 371}_2
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨  b^{2, 371}_1
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨  p_740 ∨ -b^{2, 371}_0
c  in DIMACS:
-5756  5757 -5758  740  5759 0
-5756  5757 -5758  740  5760 0
-5756  5757 -5758  740 -5761 0

c  -2-1 --> break 
c    ( b^{2, 370}_2 ∧  b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨  b^{2, 370}_0 ∨  p_740 ∨ break
c  in DIMACS:
-5756 -5757  5758  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 370}_2 ∧ -b^{2, 370}_1 ∧ -b^{2, 370}_0 ∧ true) 
c  in CNF:
c    -b^{2, 370}_2 ∨  b^{2, 370}_1 ∨  b^{2, 370}_0 ∨ false 
c  in DIMACS:
-5756  5757  5758  0

c  3 does not represent an automaton state.
c    -(-b^{2, 370}_2 ∧  b^{2, 370}_1 ∧  b^{2, 370}_0 ∧ true) 
c  in CNF:
c     b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ false 
c  in DIMACS:
 5756 -5757 -5758  0
c  -3 does not represent an automaton state.
c    -( b^{2, 370}_2 ∧  b^{2, 370}_1 ∧  b^{2, 370}_0 ∧ true) 
c  in CNF:
c    -b^{2, 370}_2 ∨ -b^{2, 370}_1 ∨ -b^{2, 370}_0 ∨ false 
c  in DIMACS:
-5756 -5757 -5758  0

c i = 371
c  -2+1 --> -1
c    ( b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧  p_742) -> ( b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0)
c  in CNF:
c    -b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨  b^{2, 372}_2
c    -b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_1
c    -b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨  b^{2, 372}_0
c  in DIMACS:
-5759 -5760  5761 -742  5762 0
-5759 -5760  5761 -742 -5763 0
-5759 -5760  5761 -742  5764 0

c  -1+1 --> 0
c    ( b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0 ∧  p_742) -> (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧ -b^{2, 372}_0)
c  in CNF:
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_2
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_1
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_0
c  in DIMACS:
-5759  5760 -5761 -742 -5762 0
-5759  5760 -5761 -742 -5763 0
-5759  5760 -5761 -742 -5764 0

c  0+1 --> 1
c    (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧  p_742) -> (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0)
c  in CNF:
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_2
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_1
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨  b^{2, 372}_0
c  in DIMACS:
 5759  5760  5761 -742 -5762 0
 5759  5760  5761 -742 -5763 0
 5759  5760  5761 -742  5764 0

c  1+1 --> 2
c    (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0 ∧  p_742) -> (-b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0)
c  in CNF:
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_2
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨  b^{2, 372}_1
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ -p_742 ∨ -b^{2, 372}_0
c  in DIMACS:
 5759  5760 -5761 -742 -5762 0
 5759  5760 -5761 -742  5763 0
 5759  5760 -5761 -742 -5764 0

c  2+1 --> break 
c    (-b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧  p_742) -> break
c  in CNF:
c     b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 5759 -5760  5761 -742 1162 0


c  2-1 --> 1
c    (-b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧ -p_742) -> (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0)
c  in CNF:
c     b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_2
c     b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_1
c     b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨  b^{2, 372}_0
c  in DIMACS:
 5759 -5760  5761  742 -5762 0
 5759 -5760  5761  742 -5763 0
 5759 -5760  5761  742  5764 0

c  1-1 --> 0
c    (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0 ∧ -p_742) -> (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧ -b^{2, 372}_0)
c  in CNF:
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_2
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_1
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_0
c  in DIMACS:
 5759  5760 -5761  742 -5762 0
 5759  5760 -5761  742 -5763 0
 5759  5760 -5761  742 -5764 0

c  0-1 --> -1
c    (-b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧ -p_742) -> ( b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0)
c  in CNF:
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨  b^{2, 372}_2
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_1
c     b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨  b^{2, 372}_0
c  in DIMACS:
 5759  5760  5761  742  5762 0
 5759  5760  5761  742 -5763 0
 5759  5760  5761  742  5764 0

c  -1-1 --> -2
c    ( b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧  b^{2, 371}_0 ∧ -p_742) -> ( b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0)
c  in CNF:
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨  b^{2, 372}_2
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨  b^{2, 372}_1
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨  p_742 ∨ -b^{2, 372}_0
c  in DIMACS:
-5759  5760 -5761  742  5762 0
-5759  5760 -5761  742  5763 0
-5759  5760 -5761  742 -5764 0

c  -2-1 --> break 
c    ( b^{2, 371}_2 ∧  b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨  b^{2, 371}_0 ∨  p_742 ∨ break
c  in DIMACS:
-5759 -5760  5761  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 371}_2 ∧ -b^{2, 371}_1 ∧ -b^{2, 371}_0 ∧ true) 
c  in CNF:
c    -b^{2, 371}_2 ∨  b^{2, 371}_1 ∨  b^{2, 371}_0 ∨ false 
c  in DIMACS:
-5759  5760  5761  0

c  3 does not represent an automaton state.
c    -(-b^{2, 371}_2 ∧  b^{2, 371}_1 ∧  b^{2, 371}_0 ∧ true) 
c  in CNF:
c     b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ false 
c  in DIMACS:
 5759 -5760 -5761  0
c  -3 does not represent an automaton state.
c    -( b^{2, 371}_2 ∧  b^{2, 371}_1 ∧  b^{2, 371}_0 ∧ true) 
c  in CNF:
c    -b^{2, 371}_2 ∨ -b^{2, 371}_1 ∨ -b^{2, 371}_0 ∨ false 
c  in DIMACS:
-5759 -5760 -5761  0

c i = 372
c  -2+1 --> -1
c    ( b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧  p_744) -> ( b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0)
c  in CNF:
c    -b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨  b^{2, 373}_2
c    -b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_1
c    -b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨  b^{2, 373}_0
c  in DIMACS:
-5762 -5763  5764 -744  5765 0
-5762 -5763  5764 -744 -5766 0
-5762 -5763  5764 -744  5767 0

c  -1+1 --> 0
c    ( b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0 ∧  p_744) -> (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧ -b^{2, 373}_0)
c  in CNF:
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_2
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_1
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_0
c  in DIMACS:
-5762  5763 -5764 -744 -5765 0
-5762  5763 -5764 -744 -5766 0
-5762  5763 -5764 -744 -5767 0

c  0+1 --> 1
c    (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧  p_744) -> (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0)
c  in CNF:
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_2
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_1
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨  b^{2, 373}_0
c  in DIMACS:
 5762  5763  5764 -744 -5765 0
 5762  5763  5764 -744 -5766 0
 5762  5763  5764 -744  5767 0

c  1+1 --> 2
c    (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0 ∧  p_744) -> (-b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0)
c  in CNF:
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_2
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨  b^{2, 373}_1
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ -p_744 ∨ -b^{2, 373}_0
c  in DIMACS:
 5762  5763 -5764 -744 -5765 0
 5762  5763 -5764 -744  5766 0
 5762  5763 -5764 -744 -5767 0

c  2+1 --> break 
c    (-b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧  p_744) -> break
c  in CNF:
c     b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 5762 -5763  5764 -744 1162 0


c  2-1 --> 1
c    (-b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧ -p_744) -> (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0)
c  in CNF:
c     b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_2
c     b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_1
c     b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨  b^{2, 373}_0
c  in DIMACS:
 5762 -5763  5764  744 -5765 0
 5762 -5763  5764  744 -5766 0
 5762 -5763  5764  744  5767 0

c  1-1 --> 0
c    (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0 ∧ -p_744) -> (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧ -b^{2, 373}_0)
c  in CNF:
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_2
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_1
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_0
c  in DIMACS:
 5762  5763 -5764  744 -5765 0
 5762  5763 -5764  744 -5766 0
 5762  5763 -5764  744 -5767 0

c  0-1 --> -1
c    (-b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧ -p_744) -> ( b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0)
c  in CNF:
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨  b^{2, 373}_2
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_1
c     b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨  b^{2, 373}_0
c  in DIMACS:
 5762  5763  5764  744  5765 0
 5762  5763  5764  744 -5766 0
 5762  5763  5764  744  5767 0

c  -1-1 --> -2
c    ( b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧  b^{2, 372}_0 ∧ -p_744) -> ( b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0)
c  in CNF:
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨  b^{2, 373}_2
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨  b^{2, 373}_1
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨  p_744 ∨ -b^{2, 373}_0
c  in DIMACS:
-5762  5763 -5764  744  5765 0
-5762  5763 -5764  744  5766 0
-5762  5763 -5764  744 -5767 0

c  -2-1 --> break 
c    ( b^{2, 372}_2 ∧  b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨  b^{2, 372}_0 ∨  p_744 ∨ break
c  in DIMACS:
-5762 -5763  5764  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 372}_2 ∧ -b^{2, 372}_1 ∧ -b^{2, 372}_0 ∧ true) 
c  in CNF:
c    -b^{2, 372}_2 ∨  b^{2, 372}_1 ∨  b^{2, 372}_0 ∨ false 
c  in DIMACS:
-5762  5763  5764  0

c  3 does not represent an automaton state.
c    -(-b^{2, 372}_2 ∧  b^{2, 372}_1 ∧  b^{2, 372}_0 ∧ true) 
c  in CNF:
c     b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ false 
c  in DIMACS:
 5762 -5763 -5764  0
c  -3 does not represent an automaton state.
c    -( b^{2, 372}_2 ∧  b^{2, 372}_1 ∧  b^{2, 372}_0 ∧ true) 
c  in CNF:
c    -b^{2, 372}_2 ∨ -b^{2, 372}_1 ∨ -b^{2, 372}_0 ∨ false 
c  in DIMACS:
-5762 -5763 -5764  0

c i = 373
c  -2+1 --> -1
c    ( b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧  p_746) -> ( b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0)
c  in CNF:
c    -b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨  b^{2, 374}_2
c    -b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_1
c    -b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨  b^{2, 374}_0
c  in DIMACS:
-5765 -5766  5767 -746  5768 0
-5765 -5766  5767 -746 -5769 0
-5765 -5766  5767 -746  5770 0

c  -1+1 --> 0
c    ( b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0 ∧  p_746) -> (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧ -b^{2, 374}_0)
c  in CNF:
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_2
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_1
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_0
c  in DIMACS:
-5765  5766 -5767 -746 -5768 0
-5765  5766 -5767 -746 -5769 0
-5765  5766 -5767 -746 -5770 0

c  0+1 --> 1
c    (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧  p_746) -> (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0)
c  in CNF:
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_2
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_1
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨  b^{2, 374}_0
c  in DIMACS:
 5765  5766  5767 -746 -5768 0
 5765  5766  5767 -746 -5769 0
 5765  5766  5767 -746  5770 0

c  1+1 --> 2
c    (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0 ∧  p_746) -> (-b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0)
c  in CNF:
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_2
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨  b^{2, 374}_1
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ -p_746 ∨ -b^{2, 374}_0
c  in DIMACS:
 5765  5766 -5767 -746 -5768 0
 5765  5766 -5767 -746  5769 0
 5765  5766 -5767 -746 -5770 0

c  2+1 --> break 
c    (-b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧  p_746) -> break
c  in CNF:
c     b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ -p_746 ∨ break
c  in DIMACS:
 5765 -5766  5767 -746 1162 0


c  2-1 --> 1
c    (-b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧ -p_746) -> (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0)
c  in CNF:
c     b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_2
c     b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_1
c     b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨  b^{2, 374}_0
c  in DIMACS:
 5765 -5766  5767  746 -5768 0
 5765 -5766  5767  746 -5769 0
 5765 -5766  5767  746  5770 0

c  1-1 --> 0
c    (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0 ∧ -p_746) -> (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧ -b^{2, 374}_0)
c  in CNF:
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_2
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_1
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_0
c  in DIMACS:
 5765  5766 -5767  746 -5768 0
 5765  5766 -5767  746 -5769 0
 5765  5766 -5767  746 -5770 0

c  0-1 --> -1
c    (-b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧ -p_746) -> ( b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0)
c  in CNF:
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨  b^{2, 374}_2
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_1
c     b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨  b^{2, 374}_0
c  in DIMACS:
 5765  5766  5767  746  5768 0
 5765  5766  5767  746 -5769 0
 5765  5766  5767  746  5770 0

c  -1-1 --> -2
c    ( b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧  b^{2, 373}_0 ∧ -p_746) -> ( b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0)
c  in CNF:
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨  b^{2, 374}_2
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨  b^{2, 374}_1
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨  p_746 ∨ -b^{2, 374}_0
c  in DIMACS:
-5765  5766 -5767  746  5768 0
-5765  5766 -5767  746  5769 0
-5765  5766 -5767  746 -5770 0

c  -2-1 --> break 
c    ( b^{2, 373}_2 ∧  b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧ -p_746) -> break
c  in CNF:
c    -b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨  b^{2, 373}_0 ∨  p_746 ∨ break
c  in DIMACS:
-5765 -5766  5767  746 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 373}_2 ∧ -b^{2, 373}_1 ∧ -b^{2, 373}_0 ∧ true) 
c  in CNF:
c    -b^{2, 373}_2 ∨  b^{2, 373}_1 ∨  b^{2, 373}_0 ∨ false 
c  in DIMACS:
-5765  5766  5767  0

c  3 does not represent an automaton state.
c    -(-b^{2, 373}_2 ∧  b^{2, 373}_1 ∧  b^{2, 373}_0 ∧ true) 
c  in CNF:
c     b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ false 
c  in DIMACS:
 5765 -5766 -5767  0
c  -3 does not represent an automaton state.
c    -( b^{2, 373}_2 ∧  b^{2, 373}_1 ∧  b^{2, 373}_0 ∧ true) 
c  in CNF:
c    -b^{2, 373}_2 ∨ -b^{2, 373}_1 ∨ -b^{2, 373}_0 ∨ false 
c  in DIMACS:
-5765 -5766 -5767  0

c i = 374
c  -2+1 --> -1
c    ( b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧  p_748) -> ( b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0)
c  in CNF:
c    -b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨  b^{2, 375}_2
c    -b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_1
c    -b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨  b^{2, 375}_0
c  in DIMACS:
-5768 -5769  5770 -748  5771 0
-5768 -5769  5770 -748 -5772 0
-5768 -5769  5770 -748  5773 0

c  -1+1 --> 0
c    ( b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0 ∧  p_748) -> (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧ -b^{2, 375}_0)
c  in CNF:
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_2
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_1
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_0
c  in DIMACS:
-5768  5769 -5770 -748 -5771 0
-5768  5769 -5770 -748 -5772 0
-5768  5769 -5770 -748 -5773 0

c  0+1 --> 1
c    (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧  p_748) -> (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0)
c  in CNF:
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_2
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_1
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨  b^{2, 375}_0
c  in DIMACS:
 5768  5769  5770 -748 -5771 0
 5768  5769  5770 -748 -5772 0
 5768  5769  5770 -748  5773 0

c  1+1 --> 2
c    (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0 ∧  p_748) -> (-b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0)
c  in CNF:
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_2
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨  b^{2, 375}_1
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ -p_748 ∨ -b^{2, 375}_0
c  in DIMACS:
 5768  5769 -5770 -748 -5771 0
 5768  5769 -5770 -748  5772 0
 5768  5769 -5770 -748 -5773 0

c  2+1 --> break 
c    (-b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧  p_748) -> break
c  in CNF:
c     b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 5768 -5769  5770 -748 1162 0


c  2-1 --> 1
c    (-b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧ -p_748) -> (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0)
c  in CNF:
c     b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_2
c     b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_1
c     b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨  b^{2, 375}_0
c  in DIMACS:
 5768 -5769  5770  748 -5771 0
 5768 -5769  5770  748 -5772 0
 5768 -5769  5770  748  5773 0

c  1-1 --> 0
c    (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0 ∧ -p_748) -> (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧ -b^{2, 375}_0)
c  in CNF:
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_2
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_1
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_0
c  in DIMACS:
 5768  5769 -5770  748 -5771 0
 5768  5769 -5770  748 -5772 0
 5768  5769 -5770  748 -5773 0

c  0-1 --> -1
c    (-b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧ -p_748) -> ( b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0)
c  in CNF:
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨  b^{2, 375}_2
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_1
c     b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨  b^{2, 375}_0
c  in DIMACS:
 5768  5769  5770  748  5771 0
 5768  5769  5770  748 -5772 0
 5768  5769  5770  748  5773 0

c  -1-1 --> -2
c    ( b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧  b^{2, 374}_0 ∧ -p_748) -> ( b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0)
c  in CNF:
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨  b^{2, 375}_2
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨  b^{2, 375}_1
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨  p_748 ∨ -b^{2, 375}_0
c  in DIMACS:
-5768  5769 -5770  748  5771 0
-5768  5769 -5770  748  5772 0
-5768  5769 -5770  748 -5773 0

c  -2-1 --> break 
c    ( b^{2, 374}_2 ∧  b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨  b^{2, 374}_0 ∨  p_748 ∨ break
c  in DIMACS:
-5768 -5769  5770  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 374}_2 ∧ -b^{2, 374}_1 ∧ -b^{2, 374}_0 ∧ true) 
c  in CNF:
c    -b^{2, 374}_2 ∨  b^{2, 374}_1 ∨  b^{2, 374}_0 ∨ false 
c  in DIMACS:
-5768  5769  5770  0

c  3 does not represent an automaton state.
c    -(-b^{2, 374}_2 ∧  b^{2, 374}_1 ∧  b^{2, 374}_0 ∧ true) 
c  in CNF:
c     b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ false 
c  in DIMACS:
 5768 -5769 -5770  0
c  -3 does not represent an automaton state.
c    -( b^{2, 374}_2 ∧  b^{2, 374}_1 ∧  b^{2, 374}_0 ∧ true) 
c  in CNF:
c    -b^{2, 374}_2 ∨ -b^{2, 374}_1 ∨ -b^{2, 374}_0 ∨ false 
c  in DIMACS:
-5768 -5769 -5770  0

c i = 375
c  -2+1 --> -1
c    ( b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧  p_750) -> ( b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0)
c  in CNF:
c    -b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨  b^{2, 376}_2
c    -b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_1
c    -b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨  b^{2, 376}_0
c  in DIMACS:
-5771 -5772  5773 -750  5774 0
-5771 -5772  5773 -750 -5775 0
-5771 -5772  5773 -750  5776 0

c  -1+1 --> 0
c    ( b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0 ∧  p_750) -> (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧ -b^{2, 376}_0)
c  in CNF:
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_2
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_1
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_0
c  in DIMACS:
-5771  5772 -5773 -750 -5774 0
-5771  5772 -5773 -750 -5775 0
-5771  5772 -5773 -750 -5776 0

c  0+1 --> 1
c    (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧  p_750) -> (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0)
c  in CNF:
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_2
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_1
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨  b^{2, 376}_0
c  in DIMACS:
 5771  5772  5773 -750 -5774 0
 5771  5772  5773 -750 -5775 0
 5771  5772  5773 -750  5776 0

c  1+1 --> 2
c    (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0 ∧  p_750) -> (-b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0)
c  in CNF:
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_2
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨  b^{2, 376}_1
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ -p_750 ∨ -b^{2, 376}_0
c  in DIMACS:
 5771  5772 -5773 -750 -5774 0
 5771  5772 -5773 -750  5775 0
 5771  5772 -5773 -750 -5776 0

c  2+1 --> break 
c    (-b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧  p_750) -> break
c  in CNF:
c     b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 5771 -5772  5773 -750 1162 0


c  2-1 --> 1
c    (-b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧ -p_750) -> (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0)
c  in CNF:
c     b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_2
c     b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_1
c     b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨  b^{2, 376}_0
c  in DIMACS:
 5771 -5772  5773  750 -5774 0
 5771 -5772  5773  750 -5775 0
 5771 -5772  5773  750  5776 0

c  1-1 --> 0
c    (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0 ∧ -p_750) -> (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧ -b^{2, 376}_0)
c  in CNF:
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_2
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_1
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_0
c  in DIMACS:
 5771  5772 -5773  750 -5774 0
 5771  5772 -5773  750 -5775 0
 5771  5772 -5773  750 -5776 0

c  0-1 --> -1
c    (-b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧ -p_750) -> ( b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0)
c  in CNF:
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨  b^{2, 376}_2
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_1
c     b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨  b^{2, 376}_0
c  in DIMACS:
 5771  5772  5773  750  5774 0
 5771  5772  5773  750 -5775 0
 5771  5772  5773  750  5776 0

c  -1-1 --> -2
c    ( b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧  b^{2, 375}_0 ∧ -p_750) -> ( b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0)
c  in CNF:
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨  b^{2, 376}_2
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨  b^{2, 376}_1
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨  p_750 ∨ -b^{2, 376}_0
c  in DIMACS:
-5771  5772 -5773  750  5774 0
-5771  5772 -5773  750  5775 0
-5771  5772 -5773  750 -5776 0

c  -2-1 --> break 
c    ( b^{2, 375}_2 ∧  b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨  b^{2, 375}_0 ∨  p_750 ∨ break
c  in DIMACS:
-5771 -5772  5773  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 375}_2 ∧ -b^{2, 375}_1 ∧ -b^{2, 375}_0 ∧ true) 
c  in CNF:
c    -b^{2, 375}_2 ∨  b^{2, 375}_1 ∨  b^{2, 375}_0 ∨ false 
c  in DIMACS:
-5771  5772  5773  0

c  3 does not represent an automaton state.
c    -(-b^{2, 375}_2 ∧  b^{2, 375}_1 ∧  b^{2, 375}_0 ∧ true) 
c  in CNF:
c     b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ false 
c  in DIMACS:
 5771 -5772 -5773  0
c  -3 does not represent an automaton state.
c    -( b^{2, 375}_2 ∧  b^{2, 375}_1 ∧  b^{2, 375}_0 ∧ true) 
c  in CNF:
c    -b^{2, 375}_2 ∨ -b^{2, 375}_1 ∨ -b^{2, 375}_0 ∨ false 
c  in DIMACS:
-5771 -5772 -5773  0

c i = 376
c  -2+1 --> -1
c    ( b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧  p_752) -> ( b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0)
c  in CNF:
c    -b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨  b^{2, 377}_2
c    -b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_1
c    -b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨  b^{2, 377}_0
c  in DIMACS:
-5774 -5775  5776 -752  5777 0
-5774 -5775  5776 -752 -5778 0
-5774 -5775  5776 -752  5779 0

c  -1+1 --> 0
c    ( b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0 ∧  p_752) -> (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧ -b^{2, 377}_0)
c  in CNF:
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_2
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_1
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_0
c  in DIMACS:
-5774  5775 -5776 -752 -5777 0
-5774  5775 -5776 -752 -5778 0
-5774  5775 -5776 -752 -5779 0

c  0+1 --> 1
c    (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧  p_752) -> (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0)
c  in CNF:
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_2
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_1
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨  b^{2, 377}_0
c  in DIMACS:
 5774  5775  5776 -752 -5777 0
 5774  5775  5776 -752 -5778 0
 5774  5775  5776 -752  5779 0

c  1+1 --> 2
c    (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0 ∧  p_752) -> (-b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0)
c  in CNF:
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_2
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨  b^{2, 377}_1
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ -p_752 ∨ -b^{2, 377}_0
c  in DIMACS:
 5774  5775 -5776 -752 -5777 0
 5774  5775 -5776 -752  5778 0
 5774  5775 -5776 -752 -5779 0

c  2+1 --> break 
c    (-b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧  p_752) -> break
c  in CNF:
c     b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 5774 -5775  5776 -752 1162 0


c  2-1 --> 1
c    (-b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧ -p_752) -> (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0)
c  in CNF:
c     b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_2
c     b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_1
c     b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨  b^{2, 377}_0
c  in DIMACS:
 5774 -5775  5776  752 -5777 0
 5774 -5775  5776  752 -5778 0
 5774 -5775  5776  752  5779 0

c  1-1 --> 0
c    (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0 ∧ -p_752) -> (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧ -b^{2, 377}_0)
c  in CNF:
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_2
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_1
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_0
c  in DIMACS:
 5774  5775 -5776  752 -5777 0
 5774  5775 -5776  752 -5778 0
 5774  5775 -5776  752 -5779 0

c  0-1 --> -1
c    (-b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧ -p_752) -> ( b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0)
c  in CNF:
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨  b^{2, 377}_2
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_1
c     b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨  b^{2, 377}_0
c  in DIMACS:
 5774  5775  5776  752  5777 0
 5774  5775  5776  752 -5778 0
 5774  5775  5776  752  5779 0

c  -1-1 --> -2
c    ( b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧  b^{2, 376}_0 ∧ -p_752) -> ( b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0)
c  in CNF:
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨  b^{2, 377}_2
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨  b^{2, 377}_1
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨  p_752 ∨ -b^{2, 377}_0
c  in DIMACS:
-5774  5775 -5776  752  5777 0
-5774  5775 -5776  752  5778 0
-5774  5775 -5776  752 -5779 0

c  -2-1 --> break 
c    ( b^{2, 376}_2 ∧  b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨  b^{2, 376}_0 ∨  p_752 ∨ break
c  in DIMACS:
-5774 -5775  5776  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 376}_2 ∧ -b^{2, 376}_1 ∧ -b^{2, 376}_0 ∧ true) 
c  in CNF:
c    -b^{2, 376}_2 ∨  b^{2, 376}_1 ∨  b^{2, 376}_0 ∨ false 
c  in DIMACS:
-5774  5775  5776  0

c  3 does not represent an automaton state.
c    -(-b^{2, 376}_2 ∧  b^{2, 376}_1 ∧  b^{2, 376}_0 ∧ true) 
c  in CNF:
c     b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ false 
c  in DIMACS:
 5774 -5775 -5776  0
c  -3 does not represent an automaton state.
c    -( b^{2, 376}_2 ∧  b^{2, 376}_1 ∧  b^{2, 376}_0 ∧ true) 
c  in CNF:
c    -b^{2, 376}_2 ∨ -b^{2, 376}_1 ∨ -b^{2, 376}_0 ∨ false 
c  in DIMACS:
-5774 -5775 -5776  0

c i = 377
c  -2+1 --> -1
c    ( b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧  p_754) -> ( b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0)
c  in CNF:
c    -b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨  b^{2, 378}_2
c    -b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_1
c    -b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨  b^{2, 378}_0
c  in DIMACS:
-5777 -5778  5779 -754  5780 0
-5777 -5778  5779 -754 -5781 0
-5777 -5778  5779 -754  5782 0

c  -1+1 --> 0
c    ( b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0 ∧  p_754) -> (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧ -b^{2, 378}_0)
c  in CNF:
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_2
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_1
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_0
c  in DIMACS:
-5777  5778 -5779 -754 -5780 0
-5777  5778 -5779 -754 -5781 0
-5777  5778 -5779 -754 -5782 0

c  0+1 --> 1
c    (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧  p_754) -> (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0)
c  in CNF:
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_2
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_1
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨  b^{2, 378}_0
c  in DIMACS:
 5777  5778  5779 -754 -5780 0
 5777  5778  5779 -754 -5781 0
 5777  5778  5779 -754  5782 0

c  1+1 --> 2
c    (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0 ∧  p_754) -> (-b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0)
c  in CNF:
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_2
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨  b^{2, 378}_1
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ -p_754 ∨ -b^{2, 378}_0
c  in DIMACS:
 5777  5778 -5779 -754 -5780 0
 5777  5778 -5779 -754  5781 0
 5777  5778 -5779 -754 -5782 0

c  2+1 --> break 
c    (-b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧  p_754) -> break
c  in CNF:
c     b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 5777 -5778  5779 -754 1162 0


c  2-1 --> 1
c    (-b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧ -p_754) -> (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0)
c  in CNF:
c     b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_2
c     b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_1
c     b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨  b^{2, 378}_0
c  in DIMACS:
 5777 -5778  5779  754 -5780 0
 5777 -5778  5779  754 -5781 0
 5777 -5778  5779  754  5782 0

c  1-1 --> 0
c    (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0 ∧ -p_754) -> (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧ -b^{2, 378}_0)
c  in CNF:
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_2
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_1
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_0
c  in DIMACS:
 5777  5778 -5779  754 -5780 0
 5777  5778 -5779  754 -5781 0
 5777  5778 -5779  754 -5782 0

c  0-1 --> -1
c    (-b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧ -p_754) -> ( b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0)
c  in CNF:
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨  b^{2, 378}_2
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_1
c     b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨  b^{2, 378}_0
c  in DIMACS:
 5777  5778  5779  754  5780 0
 5777  5778  5779  754 -5781 0
 5777  5778  5779  754  5782 0

c  -1-1 --> -2
c    ( b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧  b^{2, 377}_0 ∧ -p_754) -> ( b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0)
c  in CNF:
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨  b^{2, 378}_2
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨  b^{2, 378}_1
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨  p_754 ∨ -b^{2, 378}_0
c  in DIMACS:
-5777  5778 -5779  754  5780 0
-5777  5778 -5779  754  5781 0
-5777  5778 -5779  754 -5782 0

c  -2-1 --> break 
c    ( b^{2, 377}_2 ∧  b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨  b^{2, 377}_0 ∨  p_754 ∨ break
c  in DIMACS:
-5777 -5778  5779  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 377}_2 ∧ -b^{2, 377}_1 ∧ -b^{2, 377}_0 ∧ true) 
c  in CNF:
c    -b^{2, 377}_2 ∨  b^{2, 377}_1 ∨  b^{2, 377}_0 ∨ false 
c  in DIMACS:
-5777  5778  5779  0

c  3 does not represent an automaton state.
c    -(-b^{2, 377}_2 ∧  b^{2, 377}_1 ∧  b^{2, 377}_0 ∧ true) 
c  in CNF:
c     b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ false 
c  in DIMACS:
 5777 -5778 -5779  0
c  -3 does not represent an automaton state.
c    -( b^{2, 377}_2 ∧  b^{2, 377}_1 ∧  b^{2, 377}_0 ∧ true) 
c  in CNF:
c    -b^{2, 377}_2 ∨ -b^{2, 377}_1 ∨ -b^{2, 377}_0 ∨ false 
c  in DIMACS:
-5777 -5778 -5779  0

c i = 378
c  -2+1 --> -1
c    ( b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧  p_756) -> ( b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0)
c  in CNF:
c    -b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨  b^{2, 379}_2
c    -b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_1
c    -b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨  b^{2, 379}_0
c  in DIMACS:
-5780 -5781  5782 -756  5783 0
-5780 -5781  5782 -756 -5784 0
-5780 -5781  5782 -756  5785 0

c  -1+1 --> 0
c    ( b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0 ∧  p_756) -> (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧ -b^{2, 379}_0)
c  in CNF:
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_2
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_1
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_0
c  in DIMACS:
-5780  5781 -5782 -756 -5783 0
-5780  5781 -5782 -756 -5784 0
-5780  5781 -5782 -756 -5785 0

c  0+1 --> 1
c    (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧  p_756) -> (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0)
c  in CNF:
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_2
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_1
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨  b^{2, 379}_0
c  in DIMACS:
 5780  5781  5782 -756 -5783 0
 5780  5781  5782 -756 -5784 0
 5780  5781  5782 -756  5785 0

c  1+1 --> 2
c    (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0 ∧  p_756) -> (-b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0)
c  in CNF:
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_2
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨  b^{2, 379}_1
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ -p_756 ∨ -b^{2, 379}_0
c  in DIMACS:
 5780  5781 -5782 -756 -5783 0
 5780  5781 -5782 -756  5784 0
 5780  5781 -5782 -756 -5785 0

c  2+1 --> break 
c    (-b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧  p_756) -> break
c  in CNF:
c     b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 5780 -5781  5782 -756 1162 0


c  2-1 --> 1
c    (-b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧ -p_756) -> (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0)
c  in CNF:
c     b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_2
c     b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_1
c     b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨  b^{2, 379}_0
c  in DIMACS:
 5780 -5781  5782  756 -5783 0
 5780 -5781  5782  756 -5784 0
 5780 -5781  5782  756  5785 0

c  1-1 --> 0
c    (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0 ∧ -p_756) -> (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧ -b^{2, 379}_0)
c  in CNF:
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_2
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_1
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_0
c  in DIMACS:
 5780  5781 -5782  756 -5783 0
 5780  5781 -5782  756 -5784 0
 5780  5781 -5782  756 -5785 0

c  0-1 --> -1
c    (-b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧ -p_756) -> ( b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0)
c  in CNF:
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨  b^{2, 379}_2
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_1
c     b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨  b^{2, 379}_0
c  in DIMACS:
 5780  5781  5782  756  5783 0
 5780  5781  5782  756 -5784 0
 5780  5781  5782  756  5785 0

c  -1-1 --> -2
c    ( b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧  b^{2, 378}_0 ∧ -p_756) -> ( b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0)
c  in CNF:
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨  b^{2, 379}_2
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨  b^{2, 379}_1
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨  p_756 ∨ -b^{2, 379}_0
c  in DIMACS:
-5780  5781 -5782  756  5783 0
-5780  5781 -5782  756  5784 0
-5780  5781 -5782  756 -5785 0

c  -2-1 --> break 
c    ( b^{2, 378}_2 ∧  b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨  b^{2, 378}_0 ∨  p_756 ∨ break
c  in DIMACS:
-5780 -5781  5782  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 378}_2 ∧ -b^{2, 378}_1 ∧ -b^{2, 378}_0 ∧ true) 
c  in CNF:
c    -b^{2, 378}_2 ∨  b^{2, 378}_1 ∨  b^{2, 378}_0 ∨ false 
c  in DIMACS:
-5780  5781  5782  0

c  3 does not represent an automaton state.
c    -(-b^{2, 378}_2 ∧  b^{2, 378}_1 ∧  b^{2, 378}_0 ∧ true) 
c  in CNF:
c     b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ false 
c  in DIMACS:
 5780 -5781 -5782  0
c  -3 does not represent an automaton state.
c    -( b^{2, 378}_2 ∧  b^{2, 378}_1 ∧  b^{2, 378}_0 ∧ true) 
c  in CNF:
c    -b^{2, 378}_2 ∨ -b^{2, 378}_1 ∨ -b^{2, 378}_0 ∨ false 
c  in DIMACS:
-5780 -5781 -5782  0

c i = 379
c  -2+1 --> -1
c    ( b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧  p_758) -> ( b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0)
c  in CNF:
c    -b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨  b^{2, 380}_2
c    -b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_1
c    -b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨  b^{2, 380}_0
c  in DIMACS:
-5783 -5784  5785 -758  5786 0
-5783 -5784  5785 -758 -5787 0
-5783 -5784  5785 -758  5788 0

c  -1+1 --> 0
c    ( b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0 ∧  p_758) -> (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧ -b^{2, 380}_0)
c  in CNF:
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_2
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_1
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_0
c  in DIMACS:
-5783  5784 -5785 -758 -5786 0
-5783  5784 -5785 -758 -5787 0
-5783  5784 -5785 -758 -5788 0

c  0+1 --> 1
c    (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧  p_758) -> (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0)
c  in CNF:
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_2
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_1
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨  b^{2, 380}_0
c  in DIMACS:
 5783  5784  5785 -758 -5786 0
 5783  5784  5785 -758 -5787 0
 5783  5784  5785 -758  5788 0

c  1+1 --> 2
c    (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0 ∧  p_758) -> (-b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0)
c  in CNF:
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_2
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨  b^{2, 380}_1
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ -p_758 ∨ -b^{2, 380}_0
c  in DIMACS:
 5783  5784 -5785 -758 -5786 0
 5783  5784 -5785 -758  5787 0
 5783  5784 -5785 -758 -5788 0

c  2+1 --> break 
c    (-b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧  p_758) -> break
c  in CNF:
c     b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ -p_758 ∨ break
c  in DIMACS:
 5783 -5784  5785 -758 1162 0


c  2-1 --> 1
c    (-b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧ -p_758) -> (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0)
c  in CNF:
c     b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_2
c     b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_1
c     b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨  b^{2, 380}_0
c  in DIMACS:
 5783 -5784  5785  758 -5786 0
 5783 -5784  5785  758 -5787 0
 5783 -5784  5785  758  5788 0

c  1-1 --> 0
c    (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0 ∧ -p_758) -> (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧ -b^{2, 380}_0)
c  in CNF:
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_2
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_1
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_0
c  in DIMACS:
 5783  5784 -5785  758 -5786 0
 5783  5784 -5785  758 -5787 0
 5783  5784 -5785  758 -5788 0

c  0-1 --> -1
c    (-b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧ -p_758) -> ( b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0)
c  in CNF:
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨  b^{2, 380}_2
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_1
c     b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨  b^{2, 380}_0
c  in DIMACS:
 5783  5784  5785  758  5786 0
 5783  5784  5785  758 -5787 0
 5783  5784  5785  758  5788 0

c  -1-1 --> -2
c    ( b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧  b^{2, 379}_0 ∧ -p_758) -> ( b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0)
c  in CNF:
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨  b^{2, 380}_2
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨  b^{2, 380}_1
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨  p_758 ∨ -b^{2, 380}_0
c  in DIMACS:
-5783  5784 -5785  758  5786 0
-5783  5784 -5785  758  5787 0
-5783  5784 -5785  758 -5788 0

c  -2-1 --> break 
c    ( b^{2, 379}_2 ∧  b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧ -p_758) -> break
c  in CNF:
c    -b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨  b^{2, 379}_0 ∨  p_758 ∨ break
c  in DIMACS:
-5783 -5784  5785  758 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 379}_2 ∧ -b^{2, 379}_1 ∧ -b^{2, 379}_0 ∧ true) 
c  in CNF:
c    -b^{2, 379}_2 ∨  b^{2, 379}_1 ∨  b^{2, 379}_0 ∨ false 
c  in DIMACS:
-5783  5784  5785  0

c  3 does not represent an automaton state.
c    -(-b^{2, 379}_2 ∧  b^{2, 379}_1 ∧  b^{2, 379}_0 ∧ true) 
c  in CNF:
c     b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ false 
c  in DIMACS:
 5783 -5784 -5785  0
c  -3 does not represent an automaton state.
c    -( b^{2, 379}_2 ∧  b^{2, 379}_1 ∧  b^{2, 379}_0 ∧ true) 
c  in CNF:
c    -b^{2, 379}_2 ∨ -b^{2, 379}_1 ∨ -b^{2, 379}_0 ∨ false 
c  in DIMACS:
-5783 -5784 -5785  0

c i = 380
c  -2+1 --> -1
c    ( b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧  p_760) -> ( b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0)
c  in CNF:
c    -b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨  b^{2, 381}_2
c    -b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_1
c    -b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨  b^{2, 381}_0
c  in DIMACS:
-5786 -5787  5788 -760  5789 0
-5786 -5787  5788 -760 -5790 0
-5786 -5787  5788 -760  5791 0

c  -1+1 --> 0
c    ( b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0 ∧  p_760) -> (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧ -b^{2, 381}_0)
c  in CNF:
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_2
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_1
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_0
c  in DIMACS:
-5786  5787 -5788 -760 -5789 0
-5786  5787 -5788 -760 -5790 0
-5786  5787 -5788 -760 -5791 0

c  0+1 --> 1
c    (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧  p_760) -> (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0)
c  in CNF:
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_2
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_1
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨  b^{2, 381}_0
c  in DIMACS:
 5786  5787  5788 -760 -5789 0
 5786  5787  5788 -760 -5790 0
 5786  5787  5788 -760  5791 0

c  1+1 --> 2
c    (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0 ∧  p_760) -> (-b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0)
c  in CNF:
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_2
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨  b^{2, 381}_1
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ -p_760 ∨ -b^{2, 381}_0
c  in DIMACS:
 5786  5787 -5788 -760 -5789 0
 5786  5787 -5788 -760  5790 0
 5786  5787 -5788 -760 -5791 0

c  2+1 --> break 
c    (-b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧  p_760) -> break
c  in CNF:
c     b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 5786 -5787  5788 -760 1162 0


c  2-1 --> 1
c    (-b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧ -p_760) -> (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0)
c  in CNF:
c     b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_2
c     b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_1
c     b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨  b^{2, 381}_0
c  in DIMACS:
 5786 -5787  5788  760 -5789 0
 5786 -5787  5788  760 -5790 0
 5786 -5787  5788  760  5791 0

c  1-1 --> 0
c    (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0 ∧ -p_760) -> (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧ -b^{2, 381}_0)
c  in CNF:
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_2
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_1
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_0
c  in DIMACS:
 5786  5787 -5788  760 -5789 0
 5786  5787 -5788  760 -5790 0
 5786  5787 -5788  760 -5791 0

c  0-1 --> -1
c    (-b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧ -p_760) -> ( b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0)
c  in CNF:
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨  b^{2, 381}_2
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_1
c     b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨  b^{2, 381}_0
c  in DIMACS:
 5786  5787  5788  760  5789 0
 5786  5787  5788  760 -5790 0
 5786  5787  5788  760  5791 0

c  -1-1 --> -2
c    ( b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧  b^{2, 380}_0 ∧ -p_760) -> ( b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0)
c  in CNF:
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨  b^{2, 381}_2
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨  b^{2, 381}_1
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨  p_760 ∨ -b^{2, 381}_0
c  in DIMACS:
-5786  5787 -5788  760  5789 0
-5786  5787 -5788  760  5790 0
-5786  5787 -5788  760 -5791 0

c  -2-1 --> break 
c    ( b^{2, 380}_2 ∧  b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨  b^{2, 380}_0 ∨  p_760 ∨ break
c  in DIMACS:
-5786 -5787  5788  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 380}_2 ∧ -b^{2, 380}_1 ∧ -b^{2, 380}_0 ∧ true) 
c  in CNF:
c    -b^{2, 380}_2 ∨  b^{2, 380}_1 ∨  b^{2, 380}_0 ∨ false 
c  in DIMACS:
-5786  5787  5788  0

c  3 does not represent an automaton state.
c    -(-b^{2, 380}_2 ∧  b^{2, 380}_1 ∧  b^{2, 380}_0 ∧ true) 
c  in CNF:
c     b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ false 
c  in DIMACS:
 5786 -5787 -5788  0
c  -3 does not represent an automaton state.
c    -( b^{2, 380}_2 ∧  b^{2, 380}_1 ∧  b^{2, 380}_0 ∧ true) 
c  in CNF:
c    -b^{2, 380}_2 ∨ -b^{2, 380}_1 ∨ -b^{2, 380}_0 ∨ false 
c  in DIMACS:
-5786 -5787 -5788  0

c i = 381
c  -2+1 --> -1
c    ( b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧  p_762) -> ( b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0)
c  in CNF:
c    -b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨  b^{2, 382}_2
c    -b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_1
c    -b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨  b^{2, 382}_0
c  in DIMACS:
-5789 -5790  5791 -762  5792 0
-5789 -5790  5791 -762 -5793 0
-5789 -5790  5791 -762  5794 0

c  -1+1 --> 0
c    ( b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0 ∧  p_762) -> (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧ -b^{2, 382}_0)
c  in CNF:
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_2
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_1
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_0
c  in DIMACS:
-5789  5790 -5791 -762 -5792 0
-5789  5790 -5791 -762 -5793 0
-5789  5790 -5791 -762 -5794 0

c  0+1 --> 1
c    (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧  p_762) -> (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0)
c  in CNF:
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_2
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_1
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨  b^{2, 382}_0
c  in DIMACS:
 5789  5790  5791 -762 -5792 0
 5789  5790  5791 -762 -5793 0
 5789  5790  5791 -762  5794 0

c  1+1 --> 2
c    (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0 ∧  p_762) -> (-b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0)
c  in CNF:
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_2
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨  b^{2, 382}_1
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ -p_762 ∨ -b^{2, 382}_0
c  in DIMACS:
 5789  5790 -5791 -762 -5792 0
 5789  5790 -5791 -762  5793 0
 5789  5790 -5791 -762 -5794 0

c  2+1 --> break 
c    (-b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧  p_762) -> break
c  in CNF:
c     b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 5789 -5790  5791 -762 1162 0


c  2-1 --> 1
c    (-b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧ -p_762) -> (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0)
c  in CNF:
c     b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_2
c     b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_1
c     b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨  b^{2, 382}_0
c  in DIMACS:
 5789 -5790  5791  762 -5792 0
 5789 -5790  5791  762 -5793 0
 5789 -5790  5791  762  5794 0

c  1-1 --> 0
c    (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0 ∧ -p_762) -> (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧ -b^{2, 382}_0)
c  in CNF:
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_2
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_1
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_0
c  in DIMACS:
 5789  5790 -5791  762 -5792 0
 5789  5790 -5791  762 -5793 0
 5789  5790 -5791  762 -5794 0

c  0-1 --> -1
c    (-b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧ -p_762) -> ( b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0)
c  in CNF:
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨  b^{2, 382}_2
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_1
c     b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨  b^{2, 382}_0
c  in DIMACS:
 5789  5790  5791  762  5792 0
 5789  5790  5791  762 -5793 0
 5789  5790  5791  762  5794 0

c  -1-1 --> -2
c    ( b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧  b^{2, 381}_0 ∧ -p_762) -> ( b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0)
c  in CNF:
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨  b^{2, 382}_2
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨  b^{2, 382}_1
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨  p_762 ∨ -b^{2, 382}_0
c  in DIMACS:
-5789  5790 -5791  762  5792 0
-5789  5790 -5791  762  5793 0
-5789  5790 -5791  762 -5794 0

c  -2-1 --> break 
c    ( b^{2, 381}_2 ∧  b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨  b^{2, 381}_0 ∨  p_762 ∨ break
c  in DIMACS:
-5789 -5790  5791  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 381}_2 ∧ -b^{2, 381}_1 ∧ -b^{2, 381}_0 ∧ true) 
c  in CNF:
c    -b^{2, 381}_2 ∨  b^{2, 381}_1 ∨  b^{2, 381}_0 ∨ false 
c  in DIMACS:
-5789  5790  5791  0

c  3 does not represent an automaton state.
c    -(-b^{2, 381}_2 ∧  b^{2, 381}_1 ∧  b^{2, 381}_0 ∧ true) 
c  in CNF:
c     b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ false 
c  in DIMACS:
 5789 -5790 -5791  0
c  -3 does not represent an automaton state.
c    -( b^{2, 381}_2 ∧  b^{2, 381}_1 ∧  b^{2, 381}_0 ∧ true) 
c  in CNF:
c    -b^{2, 381}_2 ∨ -b^{2, 381}_1 ∨ -b^{2, 381}_0 ∨ false 
c  in DIMACS:
-5789 -5790 -5791  0

c i = 382
c  -2+1 --> -1
c    ( b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧  p_764) -> ( b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0)
c  in CNF:
c    -b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨  b^{2, 383}_2
c    -b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_1
c    -b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨  b^{2, 383}_0
c  in DIMACS:
-5792 -5793  5794 -764  5795 0
-5792 -5793  5794 -764 -5796 0
-5792 -5793  5794 -764  5797 0

c  -1+1 --> 0
c    ( b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0 ∧  p_764) -> (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧ -b^{2, 383}_0)
c  in CNF:
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_2
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_1
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_0
c  in DIMACS:
-5792  5793 -5794 -764 -5795 0
-5792  5793 -5794 -764 -5796 0
-5792  5793 -5794 -764 -5797 0

c  0+1 --> 1
c    (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧  p_764) -> (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0)
c  in CNF:
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_2
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_1
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨  b^{2, 383}_0
c  in DIMACS:
 5792  5793  5794 -764 -5795 0
 5792  5793  5794 -764 -5796 0
 5792  5793  5794 -764  5797 0

c  1+1 --> 2
c    (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0 ∧  p_764) -> (-b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0)
c  in CNF:
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_2
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨  b^{2, 383}_1
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ -p_764 ∨ -b^{2, 383}_0
c  in DIMACS:
 5792  5793 -5794 -764 -5795 0
 5792  5793 -5794 -764  5796 0
 5792  5793 -5794 -764 -5797 0

c  2+1 --> break 
c    (-b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧  p_764) -> break
c  in CNF:
c     b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ -p_764 ∨ break
c  in DIMACS:
 5792 -5793  5794 -764 1162 0


c  2-1 --> 1
c    (-b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧ -p_764) -> (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0)
c  in CNF:
c     b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_2
c     b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_1
c     b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨  b^{2, 383}_0
c  in DIMACS:
 5792 -5793  5794  764 -5795 0
 5792 -5793  5794  764 -5796 0
 5792 -5793  5794  764  5797 0

c  1-1 --> 0
c    (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0 ∧ -p_764) -> (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧ -b^{2, 383}_0)
c  in CNF:
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_2
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_1
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_0
c  in DIMACS:
 5792  5793 -5794  764 -5795 0
 5792  5793 -5794  764 -5796 0
 5792  5793 -5794  764 -5797 0

c  0-1 --> -1
c    (-b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧ -p_764) -> ( b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0)
c  in CNF:
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨  b^{2, 383}_2
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_1
c     b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨  b^{2, 383}_0
c  in DIMACS:
 5792  5793  5794  764  5795 0
 5792  5793  5794  764 -5796 0
 5792  5793  5794  764  5797 0

c  -1-1 --> -2
c    ( b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧  b^{2, 382}_0 ∧ -p_764) -> ( b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0)
c  in CNF:
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨  b^{2, 383}_2
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨  b^{2, 383}_1
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨  p_764 ∨ -b^{2, 383}_0
c  in DIMACS:
-5792  5793 -5794  764  5795 0
-5792  5793 -5794  764  5796 0
-5792  5793 -5794  764 -5797 0

c  -2-1 --> break 
c    ( b^{2, 382}_2 ∧  b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧ -p_764) -> break
c  in CNF:
c    -b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨  b^{2, 382}_0 ∨  p_764 ∨ break
c  in DIMACS:
-5792 -5793  5794  764 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 382}_2 ∧ -b^{2, 382}_1 ∧ -b^{2, 382}_0 ∧ true) 
c  in CNF:
c    -b^{2, 382}_2 ∨  b^{2, 382}_1 ∨  b^{2, 382}_0 ∨ false 
c  in DIMACS:
-5792  5793  5794  0

c  3 does not represent an automaton state.
c    -(-b^{2, 382}_2 ∧  b^{2, 382}_1 ∧  b^{2, 382}_0 ∧ true) 
c  in CNF:
c     b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ false 
c  in DIMACS:
 5792 -5793 -5794  0
c  -3 does not represent an automaton state.
c    -( b^{2, 382}_2 ∧  b^{2, 382}_1 ∧  b^{2, 382}_0 ∧ true) 
c  in CNF:
c    -b^{2, 382}_2 ∨ -b^{2, 382}_1 ∨ -b^{2, 382}_0 ∨ false 
c  in DIMACS:
-5792 -5793 -5794  0

c i = 383
c  -2+1 --> -1
c    ( b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧  p_766) -> ( b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0)
c  in CNF:
c    -b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨  b^{2, 384}_2
c    -b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_1
c    -b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨  b^{2, 384}_0
c  in DIMACS:
-5795 -5796  5797 -766  5798 0
-5795 -5796  5797 -766 -5799 0
-5795 -5796  5797 -766  5800 0

c  -1+1 --> 0
c    ( b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0 ∧  p_766) -> (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧ -b^{2, 384}_0)
c  in CNF:
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_2
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_1
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_0
c  in DIMACS:
-5795  5796 -5797 -766 -5798 0
-5795  5796 -5797 -766 -5799 0
-5795  5796 -5797 -766 -5800 0

c  0+1 --> 1
c    (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧  p_766) -> (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0)
c  in CNF:
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_2
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_1
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨  b^{2, 384}_0
c  in DIMACS:
 5795  5796  5797 -766 -5798 0
 5795  5796  5797 -766 -5799 0
 5795  5796  5797 -766  5800 0

c  1+1 --> 2
c    (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0 ∧  p_766) -> (-b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0)
c  in CNF:
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_2
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨  b^{2, 384}_1
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ -p_766 ∨ -b^{2, 384}_0
c  in DIMACS:
 5795  5796 -5797 -766 -5798 0
 5795  5796 -5797 -766  5799 0
 5795  5796 -5797 -766 -5800 0

c  2+1 --> break 
c    (-b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧  p_766) -> break
c  in CNF:
c     b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ -p_766 ∨ break
c  in DIMACS:
 5795 -5796  5797 -766 1162 0


c  2-1 --> 1
c    (-b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧ -p_766) -> (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0)
c  in CNF:
c     b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_2
c     b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_1
c     b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨  b^{2, 384}_0
c  in DIMACS:
 5795 -5796  5797  766 -5798 0
 5795 -5796  5797  766 -5799 0
 5795 -5796  5797  766  5800 0

c  1-1 --> 0
c    (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0 ∧ -p_766) -> (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧ -b^{2, 384}_0)
c  in CNF:
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_2
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_1
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_0
c  in DIMACS:
 5795  5796 -5797  766 -5798 0
 5795  5796 -5797  766 -5799 0
 5795  5796 -5797  766 -5800 0

c  0-1 --> -1
c    (-b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧ -p_766) -> ( b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0)
c  in CNF:
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨  b^{2, 384}_2
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_1
c     b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨  b^{2, 384}_0
c  in DIMACS:
 5795  5796  5797  766  5798 0
 5795  5796  5797  766 -5799 0
 5795  5796  5797  766  5800 0

c  -1-1 --> -2
c    ( b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧  b^{2, 383}_0 ∧ -p_766) -> ( b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0)
c  in CNF:
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨  b^{2, 384}_2
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨  b^{2, 384}_1
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨  p_766 ∨ -b^{2, 384}_0
c  in DIMACS:
-5795  5796 -5797  766  5798 0
-5795  5796 -5797  766  5799 0
-5795  5796 -5797  766 -5800 0

c  -2-1 --> break 
c    ( b^{2, 383}_2 ∧  b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧ -p_766) -> break
c  in CNF:
c    -b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨  b^{2, 383}_0 ∨  p_766 ∨ break
c  in DIMACS:
-5795 -5796  5797  766 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 383}_2 ∧ -b^{2, 383}_1 ∧ -b^{2, 383}_0 ∧ true) 
c  in CNF:
c    -b^{2, 383}_2 ∨  b^{2, 383}_1 ∨  b^{2, 383}_0 ∨ false 
c  in DIMACS:
-5795  5796  5797  0

c  3 does not represent an automaton state.
c    -(-b^{2, 383}_2 ∧  b^{2, 383}_1 ∧  b^{2, 383}_0 ∧ true) 
c  in CNF:
c     b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ false 
c  in DIMACS:
 5795 -5796 -5797  0
c  -3 does not represent an automaton state.
c    -( b^{2, 383}_2 ∧  b^{2, 383}_1 ∧  b^{2, 383}_0 ∧ true) 
c  in CNF:
c    -b^{2, 383}_2 ∨ -b^{2, 383}_1 ∨ -b^{2, 383}_0 ∨ false 
c  in DIMACS:
-5795 -5796 -5797  0

c i = 384
c  -2+1 --> -1
c    ( b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧  p_768) -> ( b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0)
c  in CNF:
c    -b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨  b^{2, 385}_2
c    -b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_1
c    -b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨  b^{2, 385}_0
c  in DIMACS:
-5798 -5799  5800 -768  5801 0
-5798 -5799  5800 -768 -5802 0
-5798 -5799  5800 -768  5803 0

c  -1+1 --> 0
c    ( b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0 ∧  p_768) -> (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧ -b^{2, 385}_0)
c  in CNF:
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_2
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_1
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_0
c  in DIMACS:
-5798  5799 -5800 -768 -5801 0
-5798  5799 -5800 -768 -5802 0
-5798  5799 -5800 -768 -5803 0

c  0+1 --> 1
c    (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧  p_768) -> (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0)
c  in CNF:
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_2
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_1
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨  b^{2, 385}_0
c  in DIMACS:
 5798  5799  5800 -768 -5801 0
 5798  5799  5800 -768 -5802 0
 5798  5799  5800 -768  5803 0

c  1+1 --> 2
c    (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0 ∧  p_768) -> (-b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0)
c  in CNF:
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_2
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨  b^{2, 385}_1
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ -p_768 ∨ -b^{2, 385}_0
c  in DIMACS:
 5798  5799 -5800 -768 -5801 0
 5798  5799 -5800 -768  5802 0
 5798  5799 -5800 -768 -5803 0

c  2+1 --> break 
c    (-b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧  p_768) -> break
c  in CNF:
c     b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 5798 -5799  5800 -768 1162 0


c  2-1 --> 1
c    (-b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧ -p_768) -> (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0)
c  in CNF:
c     b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_2
c     b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_1
c     b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨  b^{2, 385}_0
c  in DIMACS:
 5798 -5799  5800  768 -5801 0
 5798 -5799  5800  768 -5802 0
 5798 -5799  5800  768  5803 0

c  1-1 --> 0
c    (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0 ∧ -p_768) -> (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧ -b^{2, 385}_0)
c  in CNF:
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_2
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_1
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_0
c  in DIMACS:
 5798  5799 -5800  768 -5801 0
 5798  5799 -5800  768 -5802 0
 5798  5799 -5800  768 -5803 0

c  0-1 --> -1
c    (-b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧ -p_768) -> ( b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0)
c  in CNF:
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨  b^{2, 385}_2
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_1
c     b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨  b^{2, 385}_0
c  in DIMACS:
 5798  5799  5800  768  5801 0
 5798  5799  5800  768 -5802 0
 5798  5799  5800  768  5803 0

c  -1-1 --> -2
c    ( b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧  b^{2, 384}_0 ∧ -p_768) -> ( b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0)
c  in CNF:
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨  b^{2, 385}_2
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨  b^{2, 385}_1
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨  p_768 ∨ -b^{2, 385}_0
c  in DIMACS:
-5798  5799 -5800  768  5801 0
-5798  5799 -5800  768  5802 0
-5798  5799 -5800  768 -5803 0

c  -2-1 --> break 
c    ( b^{2, 384}_2 ∧  b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨  b^{2, 384}_0 ∨  p_768 ∨ break
c  in DIMACS:
-5798 -5799  5800  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 384}_2 ∧ -b^{2, 384}_1 ∧ -b^{2, 384}_0 ∧ true) 
c  in CNF:
c    -b^{2, 384}_2 ∨  b^{2, 384}_1 ∨  b^{2, 384}_0 ∨ false 
c  in DIMACS:
-5798  5799  5800  0

c  3 does not represent an automaton state.
c    -(-b^{2, 384}_2 ∧  b^{2, 384}_1 ∧  b^{2, 384}_0 ∧ true) 
c  in CNF:
c     b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ false 
c  in DIMACS:
 5798 -5799 -5800  0
c  -3 does not represent an automaton state.
c    -( b^{2, 384}_2 ∧  b^{2, 384}_1 ∧  b^{2, 384}_0 ∧ true) 
c  in CNF:
c    -b^{2, 384}_2 ∨ -b^{2, 384}_1 ∨ -b^{2, 384}_0 ∨ false 
c  in DIMACS:
-5798 -5799 -5800  0

c i = 385
c  -2+1 --> -1
c    ( b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧  p_770) -> ( b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0)
c  in CNF:
c    -b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨  b^{2, 386}_2
c    -b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_1
c    -b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨  b^{2, 386}_0
c  in DIMACS:
-5801 -5802  5803 -770  5804 0
-5801 -5802  5803 -770 -5805 0
-5801 -5802  5803 -770  5806 0

c  -1+1 --> 0
c    ( b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0 ∧  p_770) -> (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧ -b^{2, 386}_0)
c  in CNF:
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_2
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_1
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_0
c  in DIMACS:
-5801  5802 -5803 -770 -5804 0
-5801  5802 -5803 -770 -5805 0
-5801  5802 -5803 -770 -5806 0

c  0+1 --> 1
c    (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧  p_770) -> (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0)
c  in CNF:
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_2
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_1
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨  b^{2, 386}_0
c  in DIMACS:
 5801  5802  5803 -770 -5804 0
 5801  5802  5803 -770 -5805 0
 5801  5802  5803 -770  5806 0

c  1+1 --> 2
c    (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0 ∧  p_770) -> (-b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0)
c  in CNF:
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_2
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨  b^{2, 386}_1
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ -p_770 ∨ -b^{2, 386}_0
c  in DIMACS:
 5801  5802 -5803 -770 -5804 0
 5801  5802 -5803 -770  5805 0
 5801  5802 -5803 -770 -5806 0

c  2+1 --> break 
c    (-b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧  p_770) -> break
c  in CNF:
c     b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 5801 -5802  5803 -770 1162 0


c  2-1 --> 1
c    (-b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧ -p_770) -> (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0)
c  in CNF:
c     b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_2
c     b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_1
c     b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨  b^{2, 386}_0
c  in DIMACS:
 5801 -5802  5803  770 -5804 0
 5801 -5802  5803  770 -5805 0
 5801 -5802  5803  770  5806 0

c  1-1 --> 0
c    (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0 ∧ -p_770) -> (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧ -b^{2, 386}_0)
c  in CNF:
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_2
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_1
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_0
c  in DIMACS:
 5801  5802 -5803  770 -5804 0
 5801  5802 -5803  770 -5805 0
 5801  5802 -5803  770 -5806 0

c  0-1 --> -1
c    (-b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧ -p_770) -> ( b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0)
c  in CNF:
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨  b^{2, 386}_2
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_1
c     b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨  b^{2, 386}_0
c  in DIMACS:
 5801  5802  5803  770  5804 0
 5801  5802  5803  770 -5805 0
 5801  5802  5803  770  5806 0

c  -1-1 --> -2
c    ( b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧  b^{2, 385}_0 ∧ -p_770) -> ( b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0)
c  in CNF:
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨  b^{2, 386}_2
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨  b^{2, 386}_1
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨  p_770 ∨ -b^{2, 386}_0
c  in DIMACS:
-5801  5802 -5803  770  5804 0
-5801  5802 -5803  770  5805 0
-5801  5802 -5803  770 -5806 0

c  -2-1 --> break 
c    ( b^{2, 385}_2 ∧  b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨  b^{2, 385}_0 ∨  p_770 ∨ break
c  in DIMACS:
-5801 -5802  5803  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 385}_2 ∧ -b^{2, 385}_1 ∧ -b^{2, 385}_0 ∧ true) 
c  in CNF:
c    -b^{2, 385}_2 ∨  b^{2, 385}_1 ∨  b^{2, 385}_0 ∨ false 
c  in DIMACS:
-5801  5802  5803  0

c  3 does not represent an automaton state.
c    -(-b^{2, 385}_2 ∧  b^{2, 385}_1 ∧  b^{2, 385}_0 ∧ true) 
c  in CNF:
c     b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ false 
c  in DIMACS:
 5801 -5802 -5803  0
c  -3 does not represent an automaton state.
c    -( b^{2, 385}_2 ∧  b^{2, 385}_1 ∧  b^{2, 385}_0 ∧ true) 
c  in CNF:
c    -b^{2, 385}_2 ∨ -b^{2, 385}_1 ∨ -b^{2, 385}_0 ∨ false 
c  in DIMACS:
-5801 -5802 -5803  0

c i = 386
c  -2+1 --> -1
c    ( b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧  p_772) -> ( b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0)
c  in CNF:
c    -b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨  b^{2, 387}_2
c    -b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_1
c    -b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨  b^{2, 387}_0
c  in DIMACS:
-5804 -5805  5806 -772  5807 0
-5804 -5805  5806 -772 -5808 0
-5804 -5805  5806 -772  5809 0

c  -1+1 --> 0
c    ( b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0 ∧  p_772) -> (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧ -b^{2, 387}_0)
c  in CNF:
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_2
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_1
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_0
c  in DIMACS:
-5804  5805 -5806 -772 -5807 0
-5804  5805 -5806 -772 -5808 0
-5804  5805 -5806 -772 -5809 0

c  0+1 --> 1
c    (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧  p_772) -> (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0)
c  in CNF:
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_2
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_1
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨  b^{2, 387}_0
c  in DIMACS:
 5804  5805  5806 -772 -5807 0
 5804  5805  5806 -772 -5808 0
 5804  5805  5806 -772  5809 0

c  1+1 --> 2
c    (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0 ∧  p_772) -> (-b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0)
c  in CNF:
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_2
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨  b^{2, 387}_1
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ -p_772 ∨ -b^{2, 387}_0
c  in DIMACS:
 5804  5805 -5806 -772 -5807 0
 5804  5805 -5806 -772  5808 0
 5804  5805 -5806 -772 -5809 0

c  2+1 --> break 
c    (-b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧  p_772) -> break
c  in CNF:
c     b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ -p_772 ∨ break
c  in DIMACS:
 5804 -5805  5806 -772 1162 0


c  2-1 --> 1
c    (-b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧ -p_772) -> (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0)
c  in CNF:
c     b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_2
c     b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_1
c     b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨  b^{2, 387}_0
c  in DIMACS:
 5804 -5805  5806  772 -5807 0
 5804 -5805  5806  772 -5808 0
 5804 -5805  5806  772  5809 0

c  1-1 --> 0
c    (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0 ∧ -p_772) -> (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧ -b^{2, 387}_0)
c  in CNF:
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_2
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_1
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_0
c  in DIMACS:
 5804  5805 -5806  772 -5807 0
 5804  5805 -5806  772 -5808 0
 5804  5805 -5806  772 -5809 0

c  0-1 --> -1
c    (-b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧ -p_772) -> ( b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0)
c  in CNF:
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨  b^{2, 387}_2
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_1
c     b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨  b^{2, 387}_0
c  in DIMACS:
 5804  5805  5806  772  5807 0
 5804  5805  5806  772 -5808 0
 5804  5805  5806  772  5809 0

c  -1-1 --> -2
c    ( b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧  b^{2, 386}_0 ∧ -p_772) -> ( b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0)
c  in CNF:
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨  b^{2, 387}_2
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨  b^{2, 387}_1
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨  p_772 ∨ -b^{2, 387}_0
c  in DIMACS:
-5804  5805 -5806  772  5807 0
-5804  5805 -5806  772  5808 0
-5804  5805 -5806  772 -5809 0

c  -2-1 --> break 
c    ( b^{2, 386}_2 ∧  b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧ -p_772) -> break
c  in CNF:
c    -b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨  b^{2, 386}_0 ∨  p_772 ∨ break
c  in DIMACS:
-5804 -5805  5806  772 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 386}_2 ∧ -b^{2, 386}_1 ∧ -b^{2, 386}_0 ∧ true) 
c  in CNF:
c    -b^{2, 386}_2 ∨  b^{2, 386}_1 ∨  b^{2, 386}_0 ∨ false 
c  in DIMACS:
-5804  5805  5806  0

c  3 does not represent an automaton state.
c    -(-b^{2, 386}_2 ∧  b^{2, 386}_1 ∧  b^{2, 386}_0 ∧ true) 
c  in CNF:
c     b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ false 
c  in DIMACS:
 5804 -5805 -5806  0
c  -3 does not represent an automaton state.
c    -( b^{2, 386}_2 ∧  b^{2, 386}_1 ∧  b^{2, 386}_0 ∧ true) 
c  in CNF:
c    -b^{2, 386}_2 ∨ -b^{2, 386}_1 ∨ -b^{2, 386}_0 ∨ false 
c  in DIMACS:
-5804 -5805 -5806  0

c i = 387
c  -2+1 --> -1
c    ( b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧  p_774) -> ( b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0)
c  in CNF:
c    -b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨  b^{2, 388}_2
c    -b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_1
c    -b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨  b^{2, 388}_0
c  in DIMACS:
-5807 -5808  5809 -774  5810 0
-5807 -5808  5809 -774 -5811 0
-5807 -5808  5809 -774  5812 0

c  -1+1 --> 0
c    ( b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0 ∧  p_774) -> (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧ -b^{2, 388}_0)
c  in CNF:
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_2
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_1
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_0
c  in DIMACS:
-5807  5808 -5809 -774 -5810 0
-5807  5808 -5809 -774 -5811 0
-5807  5808 -5809 -774 -5812 0

c  0+1 --> 1
c    (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧  p_774) -> (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0)
c  in CNF:
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_2
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_1
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨  b^{2, 388}_0
c  in DIMACS:
 5807  5808  5809 -774 -5810 0
 5807  5808  5809 -774 -5811 0
 5807  5808  5809 -774  5812 0

c  1+1 --> 2
c    (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0 ∧  p_774) -> (-b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0)
c  in CNF:
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_2
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨  b^{2, 388}_1
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ -p_774 ∨ -b^{2, 388}_0
c  in DIMACS:
 5807  5808 -5809 -774 -5810 0
 5807  5808 -5809 -774  5811 0
 5807  5808 -5809 -774 -5812 0

c  2+1 --> break 
c    (-b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧  p_774) -> break
c  in CNF:
c     b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 5807 -5808  5809 -774 1162 0


c  2-1 --> 1
c    (-b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧ -p_774) -> (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0)
c  in CNF:
c     b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_2
c     b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_1
c     b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨  b^{2, 388}_0
c  in DIMACS:
 5807 -5808  5809  774 -5810 0
 5807 -5808  5809  774 -5811 0
 5807 -5808  5809  774  5812 0

c  1-1 --> 0
c    (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0 ∧ -p_774) -> (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧ -b^{2, 388}_0)
c  in CNF:
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_2
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_1
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_0
c  in DIMACS:
 5807  5808 -5809  774 -5810 0
 5807  5808 -5809  774 -5811 0
 5807  5808 -5809  774 -5812 0

c  0-1 --> -1
c    (-b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧ -p_774) -> ( b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0)
c  in CNF:
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨  b^{2, 388}_2
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_1
c     b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨  b^{2, 388}_0
c  in DIMACS:
 5807  5808  5809  774  5810 0
 5807  5808  5809  774 -5811 0
 5807  5808  5809  774  5812 0

c  -1-1 --> -2
c    ( b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧  b^{2, 387}_0 ∧ -p_774) -> ( b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0)
c  in CNF:
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨  b^{2, 388}_2
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨  b^{2, 388}_1
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨  p_774 ∨ -b^{2, 388}_0
c  in DIMACS:
-5807  5808 -5809  774  5810 0
-5807  5808 -5809  774  5811 0
-5807  5808 -5809  774 -5812 0

c  -2-1 --> break 
c    ( b^{2, 387}_2 ∧  b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨  b^{2, 387}_0 ∨  p_774 ∨ break
c  in DIMACS:
-5807 -5808  5809  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 387}_2 ∧ -b^{2, 387}_1 ∧ -b^{2, 387}_0 ∧ true) 
c  in CNF:
c    -b^{2, 387}_2 ∨  b^{2, 387}_1 ∨  b^{2, 387}_0 ∨ false 
c  in DIMACS:
-5807  5808  5809  0

c  3 does not represent an automaton state.
c    -(-b^{2, 387}_2 ∧  b^{2, 387}_1 ∧  b^{2, 387}_0 ∧ true) 
c  in CNF:
c     b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ false 
c  in DIMACS:
 5807 -5808 -5809  0
c  -3 does not represent an automaton state.
c    -( b^{2, 387}_2 ∧  b^{2, 387}_1 ∧  b^{2, 387}_0 ∧ true) 
c  in CNF:
c    -b^{2, 387}_2 ∨ -b^{2, 387}_1 ∨ -b^{2, 387}_0 ∨ false 
c  in DIMACS:
-5807 -5808 -5809  0

c i = 388
c  -2+1 --> -1
c    ( b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧  p_776) -> ( b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0)
c  in CNF:
c    -b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨  b^{2, 389}_2
c    -b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_1
c    -b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨  b^{2, 389}_0
c  in DIMACS:
-5810 -5811  5812 -776  5813 0
-5810 -5811  5812 -776 -5814 0
-5810 -5811  5812 -776  5815 0

c  -1+1 --> 0
c    ( b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0 ∧  p_776) -> (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧ -b^{2, 389}_0)
c  in CNF:
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_2
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_1
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_0
c  in DIMACS:
-5810  5811 -5812 -776 -5813 0
-5810  5811 -5812 -776 -5814 0
-5810  5811 -5812 -776 -5815 0

c  0+1 --> 1
c    (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧  p_776) -> (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0)
c  in CNF:
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_2
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_1
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨  b^{2, 389}_0
c  in DIMACS:
 5810  5811  5812 -776 -5813 0
 5810  5811  5812 -776 -5814 0
 5810  5811  5812 -776  5815 0

c  1+1 --> 2
c    (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0 ∧  p_776) -> (-b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0)
c  in CNF:
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_2
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨  b^{2, 389}_1
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ -p_776 ∨ -b^{2, 389}_0
c  in DIMACS:
 5810  5811 -5812 -776 -5813 0
 5810  5811 -5812 -776  5814 0
 5810  5811 -5812 -776 -5815 0

c  2+1 --> break 
c    (-b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧  p_776) -> break
c  in CNF:
c     b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 5810 -5811  5812 -776 1162 0


c  2-1 --> 1
c    (-b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧ -p_776) -> (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0)
c  in CNF:
c     b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_2
c     b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_1
c     b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨  b^{2, 389}_0
c  in DIMACS:
 5810 -5811  5812  776 -5813 0
 5810 -5811  5812  776 -5814 0
 5810 -5811  5812  776  5815 0

c  1-1 --> 0
c    (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0 ∧ -p_776) -> (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧ -b^{2, 389}_0)
c  in CNF:
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_2
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_1
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_0
c  in DIMACS:
 5810  5811 -5812  776 -5813 0
 5810  5811 -5812  776 -5814 0
 5810  5811 -5812  776 -5815 0

c  0-1 --> -1
c    (-b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧ -p_776) -> ( b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0)
c  in CNF:
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨  b^{2, 389}_2
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_1
c     b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨  b^{2, 389}_0
c  in DIMACS:
 5810  5811  5812  776  5813 0
 5810  5811  5812  776 -5814 0
 5810  5811  5812  776  5815 0

c  -1-1 --> -2
c    ( b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧  b^{2, 388}_0 ∧ -p_776) -> ( b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0)
c  in CNF:
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨  b^{2, 389}_2
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨  b^{2, 389}_1
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨  p_776 ∨ -b^{2, 389}_0
c  in DIMACS:
-5810  5811 -5812  776  5813 0
-5810  5811 -5812  776  5814 0
-5810  5811 -5812  776 -5815 0

c  -2-1 --> break 
c    ( b^{2, 388}_2 ∧  b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨  b^{2, 388}_0 ∨  p_776 ∨ break
c  in DIMACS:
-5810 -5811  5812  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 388}_2 ∧ -b^{2, 388}_1 ∧ -b^{2, 388}_0 ∧ true) 
c  in CNF:
c    -b^{2, 388}_2 ∨  b^{2, 388}_1 ∨  b^{2, 388}_0 ∨ false 
c  in DIMACS:
-5810  5811  5812  0

c  3 does not represent an automaton state.
c    -(-b^{2, 388}_2 ∧  b^{2, 388}_1 ∧  b^{2, 388}_0 ∧ true) 
c  in CNF:
c     b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ false 
c  in DIMACS:
 5810 -5811 -5812  0
c  -3 does not represent an automaton state.
c    -( b^{2, 388}_2 ∧  b^{2, 388}_1 ∧  b^{2, 388}_0 ∧ true) 
c  in CNF:
c    -b^{2, 388}_2 ∨ -b^{2, 388}_1 ∨ -b^{2, 388}_0 ∨ false 
c  in DIMACS:
-5810 -5811 -5812  0

c i = 389
c  -2+1 --> -1
c    ( b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧  p_778) -> ( b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0)
c  in CNF:
c    -b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨  b^{2, 390}_2
c    -b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_1
c    -b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨  b^{2, 390}_0
c  in DIMACS:
-5813 -5814  5815 -778  5816 0
-5813 -5814  5815 -778 -5817 0
-5813 -5814  5815 -778  5818 0

c  -1+1 --> 0
c    ( b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0 ∧  p_778) -> (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧ -b^{2, 390}_0)
c  in CNF:
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_2
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_1
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_0
c  in DIMACS:
-5813  5814 -5815 -778 -5816 0
-5813  5814 -5815 -778 -5817 0
-5813  5814 -5815 -778 -5818 0

c  0+1 --> 1
c    (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧  p_778) -> (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0)
c  in CNF:
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_2
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_1
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨  b^{2, 390}_0
c  in DIMACS:
 5813  5814  5815 -778 -5816 0
 5813  5814  5815 -778 -5817 0
 5813  5814  5815 -778  5818 0

c  1+1 --> 2
c    (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0 ∧  p_778) -> (-b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0)
c  in CNF:
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_2
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨  b^{2, 390}_1
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ -p_778 ∨ -b^{2, 390}_0
c  in DIMACS:
 5813  5814 -5815 -778 -5816 0
 5813  5814 -5815 -778  5817 0
 5813  5814 -5815 -778 -5818 0

c  2+1 --> break 
c    (-b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧  p_778) -> break
c  in CNF:
c     b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ -p_778 ∨ break
c  in DIMACS:
 5813 -5814  5815 -778 1162 0


c  2-1 --> 1
c    (-b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧ -p_778) -> (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0)
c  in CNF:
c     b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_2
c     b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_1
c     b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨  b^{2, 390}_0
c  in DIMACS:
 5813 -5814  5815  778 -5816 0
 5813 -5814  5815  778 -5817 0
 5813 -5814  5815  778  5818 0

c  1-1 --> 0
c    (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0 ∧ -p_778) -> (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧ -b^{2, 390}_0)
c  in CNF:
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_2
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_1
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_0
c  in DIMACS:
 5813  5814 -5815  778 -5816 0
 5813  5814 -5815  778 -5817 0
 5813  5814 -5815  778 -5818 0

c  0-1 --> -1
c    (-b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧ -p_778) -> ( b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0)
c  in CNF:
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨  b^{2, 390}_2
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_1
c     b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨  b^{2, 390}_0
c  in DIMACS:
 5813  5814  5815  778  5816 0
 5813  5814  5815  778 -5817 0
 5813  5814  5815  778  5818 0

c  -1-1 --> -2
c    ( b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧  b^{2, 389}_0 ∧ -p_778) -> ( b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0)
c  in CNF:
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨  b^{2, 390}_2
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨  b^{2, 390}_1
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨  p_778 ∨ -b^{2, 390}_0
c  in DIMACS:
-5813  5814 -5815  778  5816 0
-5813  5814 -5815  778  5817 0
-5813  5814 -5815  778 -5818 0

c  -2-1 --> break 
c    ( b^{2, 389}_2 ∧  b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧ -p_778) -> break
c  in CNF:
c    -b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨  b^{2, 389}_0 ∨  p_778 ∨ break
c  in DIMACS:
-5813 -5814  5815  778 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 389}_2 ∧ -b^{2, 389}_1 ∧ -b^{2, 389}_0 ∧ true) 
c  in CNF:
c    -b^{2, 389}_2 ∨  b^{2, 389}_1 ∨  b^{2, 389}_0 ∨ false 
c  in DIMACS:
-5813  5814  5815  0

c  3 does not represent an automaton state.
c    -(-b^{2, 389}_2 ∧  b^{2, 389}_1 ∧  b^{2, 389}_0 ∧ true) 
c  in CNF:
c     b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ false 
c  in DIMACS:
 5813 -5814 -5815  0
c  -3 does not represent an automaton state.
c    -( b^{2, 389}_2 ∧  b^{2, 389}_1 ∧  b^{2, 389}_0 ∧ true) 
c  in CNF:
c    -b^{2, 389}_2 ∨ -b^{2, 389}_1 ∨ -b^{2, 389}_0 ∨ false 
c  in DIMACS:
-5813 -5814 -5815  0

c i = 390
c  -2+1 --> -1
c    ( b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧  p_780) -> ( b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0)
c  in CNF:
c    -b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨  b^{2, 391}_2
c    -b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_1
c    -b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨  b^{2, 391}_0
c  in DIMACS:
-5816 -5817  5818 -780  5819 0
-5816 -5817  5818 -780 -5820 0
-5816 -5817  5818 -780  5821 0

c  -1+1 --> 0
c    ( b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0 ∧  p_780) -> (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧ -b^{2, 391}_0)
c  in CNF:
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_2
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_1
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_0
c  in DIMACS:
-5816  5817 -5818 -780 -5819 0
-5816  5817 -5818 -780 -5820 0
-5816  5817 -5818 -780 -5821 0

c  0+1 --> 1
c    (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧  p_780) -> (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0)
c  in CNF:
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_2
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_1
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨  b^{2, 391}_0
c  in DIMACS:
 5816  5817  5818 -780 -5819 0
 5816  5817  5818 -780 -5820 0
 5816  5817  5818 -780  5821 0

c  1+1 --> 2
c    (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0 ∧  p_780) -> (-b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0)
c  in CNF:
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_2
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨  b^{2, 391}_1
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ -p_780 ∨ -b^{2, 391}_0
c  in DIMACS:
 5816  5817 -5818 -780 -5819 0
 5816  5817 -5818 -780  5820 0
 5816  5817 -5818 -780 -5821 0

c  2+1 --> break 
c    (-b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧  p_780) -> break
c  in CNF:
c     b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 5816 -5817  5818 -780 1162 0


c  2-1 --> 1
c    (-b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧ -p_780) -> (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0)
c  in CNF:
c     b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_2
c     b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_1
c     b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨  b^{2, 391}_0
c  in DIMACS:
 5816 -5817  5818  780 -5819 0
 5816 -5817  5818  780 -5820 0
 5816 -5817  5818  780  5821 0

c  1-1 --> 0
c    (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0 ∧ -p_780) -> (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧ -b^{2, 391}_0)
c  in CNF:
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_2
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_1
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_0
c  in DIMACS:
 5816  5817 -5818  780 -5819 0
 5816  5817 -5818  780 -5820 0
 5816  5817 -5818  780 -5821 0

c  0-1 --> -1
c    (-b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧ -p_780) -> ( b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0)
c  in CNF:
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨  b^{2, 391}_2
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_1
c     b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨  b^{2, 391}_0
c  in DIMACS:
 5816  5817  5818  780  5819 0
 5816  5817  5818  780 -5820 0
 5816  5817  5818  780  5821 0

c  -1-1 --> -2
c    ( b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧  b^{2, 390}_0 ∧ -p_780) -> ( b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0)
c  in CNF:
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨  b^{2, 391}_2
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨  b^{2, 391}_1
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨  p_780 ∨ -b^{2, 391}_0
c  in DIMACS:
-5816  5817 -5818  780  5819 0
-5816  5817 -5818  780  5820 0
-5816  5817 -5818  780 -5821 0

c  -2-1 --> break 
c    ( b^{2, 390}_2 ∧  b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨  b^{2, 390}_0 ∨  p_780 ∨ break
c  in DIMACS:
-5816 -5817  5818  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 390}_2 ∧ -b^{2, 390}_1 ∧ -b^{2, 390}_0 ∧ true) 
c  in CNF:
c    -b^{2, 390}_2 ∨  b^{2, 390}_1 ∨  b^{2, 390}_0 ∨ false 
c  in DIMACS:
-5816  5817  5818  0

c  3 does not represent an automaton state.
c    -(-b^{2, 390}_2 ∧  b^{2, 390}_1 ∧  b^{2, 390}_0 ∧ true) 
c  in CNF:
c     b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ false 
c  in DIMACS:
 5816 -5817 -5818  0
c  -3 does not represent an automaton state.
c    -( b^{2, 390}_2 ∧  b^{2, 390}_1 ∧  b^{2, 390}_0 ∧ true) 
c  in CNF:
c    -b^{2, 390}_2 ∨ -b^{2, 390}_1 ∨ -b^{2, 390}_0 ∨ false 
c  in DIMACS:
-5816 -5817 -5818  0

c i = 391
c  -2+1 --> -1
c    ( b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧  p_782) -> ( b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0)
c  in CNF:
c    -b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨  b^{2, 392}_2
c    -b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_1
c    -b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨  b^{2, 392}_0
c  in DIMACS:
-5819 -5820  5821 -782  5822 0
-5819 -5820  5821 -782 -5823 0
-5819 -5820  5821 -782  5824 0

c  -1+1 --> 0
c    ( b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0 ∧  p_782) -> (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧ -b^{2, 392}_0)
c  in CNF:
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_2
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_1
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_0
c  in DIMACS:
-5819  5820 -5821 -782 -5822 0
-5819  5820 -5821 -782 -5823 0
-5819  5820 -5821 -782 -5824 0

c  0+1 --> 1
c    (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧  p_782) -> (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0)
c  in CNF:
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_2
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_1
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨  b^{2, 392}_0
c  in DIMACS:
 5819  5820  5821 -782 -5822 0
 5819  5820  5821 -782 -5823 0
 5819  5820  5821 -782  5824 0

c  1+1 --> 2
c    (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0 ∧  p_782) -> (-b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0)
c  in CNF:
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_2
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨  b^{2, 392}_1
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ -p_782 ∨ -b^{2, 392}_0
c  in DIMACS:
 5819  5820 -5821 -782 -5822 0
 5819  5820 -5821 -782  5823 0
 5819  5820 -5821 -782 -5824 0

c  2+1 --> break 
c    (-b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧  p_782) -> break
c  in CNF:
c     b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 5819 -5820  5821 -782 1162 0


c  2-1 --> 1
c    (-b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧ -p_782) -> (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0)
c  in CNF:
c     b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_2
c     b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_1
c     b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨  b^{2, 392}_0
c  in DIMACS:
 5819 -5820  5821  782 -5822 0
 5819 -5820  5821  782 -5823 0
 5819 -5820  5821  782  5824 0

c  1-1 --> 0
c    (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0 ∧ -p_782) -> (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧ -b^{2, 392}_0)
c  in CNF:
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_2
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_1
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_0
c  in DIMACS:
 5819  5820 -5821  782 -5822 0
 5819  5820 -5821  782 -5823 0
 5819  5820 -5821  782 -5824 0

c  0-1 --> -1
c    (-b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧ -p_782) -> ( b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0)
c  in CNF:
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨  b^{2, 392}_2
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_1
c     b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨  b^{2, 392}_0
c  in DIMACS:
 5819  5820  5821  782  5822 0
 5819  5820  5821  782 -5823 0
 5819  5820  5821  782  5824 0

c  -1-1 --> -2
c    ( b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧  b^{2, 391}_0 ∧ -p_782) -> ( b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0)
c  in CNF:
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨  b^{2, 392}_2
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨  b^{2, 392}_1
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨  p_782 ∨ -b^{2, 392}_0
c  in DIMACS:
-5819  5820 -5821  782  5822 0
-5819  5820 -5821  782  5823 0
-5819  5820 -5821  782 -5824 0

c  -2-1 --> break 
c    ( b^{2, 391}_2 ∧  b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨  b^{2, 391}_0 ∨  p_782 ∨ break
c  in DIMACS:
-5819 -5820  5821  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 391}_2 ∧ -b^{2, 391}_1 ∧ -b^{2, 391}_0 ∧ true) 
c  in CNF:
c    -b^{2, 391}_2 ∨  b^{2, 391}_1 ∨  b^{2, 391}_0 ∨ false 
c  in DIMACS:
-5819  5820  5821  0

c  3 does not represent an automaton state.
c    -(-b^{2, 391}_2 ∧  b^{2, 391}_1 ∧  b^{2, 391}_0 ∧ true) 
c  in CNF:
c     b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ false 
c  in DIMACS:
 5819 -5820 -5821  0
c  -3 does not represent an automaton state.
c    -( b^{2, 391}_2 ∧  b^{2, 391}_1 ∧  b^{2, 391}_0 ∧ true) 
c  in CNF:
c    -b^{2, 391}_2 ∨ -b^{2, 391}_1 ∨ -b^{2, 391}_0 ∨ false 
c  in DIMACS:
-5819 -5820 -5821  0

c i = 392
c  -2+1 --> -1
c    ( b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧  p_784) -> ( b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0)
c  in CNF:
c    -b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨  b^{2, 393}_2
c    -b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_1
c    -b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨  b^{2, 393}_0
c  in DIMACS:
-5822 -5823  5824 -784  5825 0
-5822 -5823  5824 -784 -5826 0
-5822 -5823  5824 -784  5827 0

c  -1+1 --> 0
c    ( b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0 ∧  p_784) -> (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧ -b^{2, 393}_0)
c  in CNF:
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_2
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_1
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_0
c  in DIMACS:
-5822  5823 -5824 -784 -5825 0
-5822  5823 -5824 -784 -5826 0
-5822  5823 -5824 -784 -5827 0

c  0+1 --> 1
c    (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧  p_784) -> (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0)
c  in CNF:
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_2
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_1
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨  b^{2, 393}_0
c  in DIMACS:
 5822  5823  5824 -784 -5825 0
 5822  5823  5824 -784 -5826 0
 5822  5823  5824 -784  5827 0

c  1+1 --> 2
c    (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0 ∧  p_784) -> (-b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0)
c  in CNF:
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_2
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨  b^{2, 393}_1
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ -p_784 ∨ -b^{2, 393}_0
c  in DIMACS:
 5822  5823 -5824 -784 -5825 0
 5822  5823 -5824 -784  5826 0
 5822  5823 -5824 -784 -5827 0

c  2+1 --> break 
c    (-b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧  p_784) -> break
c  in CNF:
c     b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 5822 -5823  5824 -784 1162 0


c  2-1 --> 1
c    (-b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧ -p_784) -> (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0)
c  in CNF:
c     b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_2
c     b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_1
c     b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨  b^{2, 393}_0
c  in DIMACS:
 5822 -5823  5824  784 -5825 0
 5822 -5823  5824  784 -5826 0
 5822 -5823  5824  784  5827 0

c  1-1 --> 0
c    (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0 ∧ -p_784) -> (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧ -b^{2, 393}_0)
c  in CNF:
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_2
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_1
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_0
c  in DIMACS:
 5822  5823 -5824  784 -5825 0
 5822  5823 -5824  784 -5826 0
 5822  5823 -5824  784 -5827 0

c  0-1 --> -1
c    (-b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧ -p_784) -> ( b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0)
c  in CNF:
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨  b^{2, 393}_2
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_1
c     b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨  b^{2, 393}_0
c  in DIMACS:
 5822  5823  5824  784  5825 0
 5822  5823  5824  784 -5826 0
 5822  5823  5824  784  5827 0

c  -1-1 --> -2
c    ( b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧  b^{2, 392}_0 ∧ -p_784) -> ( b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0)
c  in CNF:
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨  b^{2, 393}_2
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨  b^{2, 393}_1
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨  p_784 ∨ -b^{2, 393}_0
c  in DIMACS:
-5822  5823 -5824  784  5825 0
-5822  5823 -5824  784  5826 0
-5822  5823 -5824  784 -5827 0

c  -2-1 --> break 
c    ( b^{2, 392}_2 ∧  b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨  b^{2, 392}_0 ∨  p_784 ∨ break
c  in DIMACS:
-5822 -5823  5824  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 392}_2 ∧ -b^{2, 392}_1 ∧ -b^{2, 392}_0 ∧ true) 
c  in CNF:
c    -b^{2, 392}_2 ∨  b^{2, 392}_1 ∨  b^{2, 392}_0 ∨ false 
c  in DIMACS:
-5822  5823  5824  0

c  3 does not represent an automaton state.
c    -(-b^{2, 392}_2 ∧  b^{2, 392}_1 ∧  b^{2, 392}_0 ∧ true) 
c  in CNF:
c     b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ false 
c  in DIMACS:
 5822 -5823 -5824  0
c  -3 does not represent an automaton state.
c    -( b^{2, 392}_2 ∧  b^{2, 392}_1 ∧  b^{2, 392}_0 ∧ true) 
c  in CNF:
c    -b^{2, 392}_2 ∨ -b^{2, 392}_1 ∨ -b^{2, 392}_0 ∨ false 
c  in DIMACS:
-5822 -5823 -5824  0

c i = 393
c  -2+1 --> -1
c    ( b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧  p_786) -> ( b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0)
c  in CNF:
c    -b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨  b^{2, 394}_2
c    -b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_1
c    -b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨  b^{2, 394}_0
c  in DIMACS:
-5825 -5826  5827 -786  5828 0
-5825 -5826  5827 -786 -5829 0
-5825 -5826  5827 -786  5830 0

c  -1+1 --> 0
c    ( b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0 ∧  p_786) -> (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧ -b^{2, 394}_0)
c  in CNF:
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_2
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_1
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_0
c  in DIMACS:
-5825  5826 -5827 -786 -5828 0
-5825  5826 -5827 -786 -5829 0
-5825  5826 -5827 -786 -5830 0

c  0+1 --> 1
c    (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧  p_786) -> (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0)
c  in CNF:
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_2
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_1
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨  b^{2, 394}_0
c  in DIMACS:
 5825  5826  5827 -786 -5828 0
 5825  5826  5827 -786 -5829 0
 5825  5826  5827 -786  5830 0

c  1+1 --> 2
c    (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0 ∧  p_786) -> (-b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0)
c  in CNF:
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_2
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨  b^{2, 394}_1
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ -p_786 ∨ -b^{2, 394}_0
c  in DIMACS:
 5825  5826 -5827 -786 -5828 0
 5825  5826 -5827 -786  5829 0
 5825  5826 -5827 -786 -5830 0

c  2+1 --> break 
c    (-b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧  p_786) -> break
c  in CNF:
c     b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 5825 -5826  5827 -786 1162 0


c  2-1 --> 1
c    (-b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧ -p_786) -> (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0)
c  in CNF:
c     b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_2
c     b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_1
c     b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨  b^{2, 394}_0
c  in DIMACS:
 5825 -5826  5827  786 -5828 0
 5825 -5826  5827  786 -5829 0
 5825 -5826  5827  786  5830 0

c  1-1 --> 0
c    (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0 ∧ -p_786) -> (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧ -b^{2, 394}_0)
c  in CNF:
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_2
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_1
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_0
c  in DIMACS:
 5825  5826 -5827  786 -5828 0
 5825  5826 -5827  786 -5829 0
 5825  5826 -5827  786 -5830 0

c  0-1 --> -1
c    (-b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧ -p_786) -> ( b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0)
c  in CNF:
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨  b^{2, 394}_2
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_1
c     b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨  b^{2, 394}_0
c  in DIMACS:
 5825  5826  5827  786  5828 0
 5825  5826  5827  786 -5829 0
 5825  5826  5827  786  5830 0

c  -1-1 --> -2
c    ( b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧  b^{2, 393}_0 ∧ -p_786) -> ( b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0)
c  in CNF:
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨  b^{2, 394}_2
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨  b^{2, 394}_1
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨  p_786 ∨ -b^{2, 394}_0
c  in DIMACS:
-5825  5826 -5827  786  5828 0
-5825  5826 -5827  786  5829 0
-5825  5826 -5827  786 -5830 0

c  -2-1 --> break 
c    ( b^{2, 393}_2 ∧  b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨  b^{2, 393}_0 ∨  p_786 ∨ break
c  in DIMACS:
-5825 -5826  5827  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 393}_2 ∧ -b^{2, 393}_1 ∧ -b^{2, 393}_0 ∧ true) 
c  in CNF:
c    -b^{2, 393}_2 ∨  b^{2, 393}_1 ∨  b^{2, 393}_0 ∨ false 
c  in DIMACS:
-5825  5826  5827  0

c  3 does not represent an automaton state.
c    -(-b^{2, 393}_2 ∧  b^{2, 393}_1 ∧  b^{2, 393}_0 ∧ true) 
c  in CNF:
c     b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ false 
c  in DIMACS:
 5825 -5826 -5827  0
c  -3 does not represent an automaton state.
c    -( b^{2, 393}_2 ∧  b^{2, 393}_1 ∧  b^{2, 393}_0 ∧ true) 
c  in CNF:
c    -b^{2, 393}_2 ∨ -b^{2, 393}_1 ∨ -b^{2, 393}_0 ∨ false 
c  in DIMACS:
-5825 -5826 -5827  0

c i = 394
c  -2+1 --> -1
c    ( b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧  p_788) -> ( b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0)
c  in CNF:
c    -b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨  b^{2, 395}_2
c    -b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_1
c    -b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨  b^{2, 395}_0
c  in DIMACS:
-5828 -5829  5830 -788  5831 0
-5828 -5829  5830 -788 -5832 0
-5828 -5829  5830 -788  5833 0

c  -1+1 --> 0
c    ( b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0 ∧  p_788) -> (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧ -b^{2, 395}_0)
c  in CNF:
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_2
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_1
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_0
c  in DIMACS:
-5828  5829 -5830 -788 -5831 0
-5828  5829 -5830 -788 -5832 0
-5828  5829 -5830 -788 -5833 0

c  0+1 --> 1
c    (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧  p_788) -> (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0)
c  in CNF:
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_2
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_1
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨  b^{2, 395}_0
c  in DIMACS:
 5828  5829  5830 -788 -5831 0
 5828  5829  5830 -788 -5832 0
 5828  5829  5830 -788  5833 0

c  1+1 --> 2
c    (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0 ∧  p_788) -> (-b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0)
c  in CNF:
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_2
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨  b^{2, 395}_1
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ -p_788 ∨ -b^{2, 395}_0
c  in DIMACS:
 5828  5829 -5830 -788 -5831 0
 5828  5829 -5830 -788  5832 0
 5828  5829 -5830 -788 -5833 0

c  2+1 --> break 
c    (-b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧  p_788) -> break
c  in CNF:
c     b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ -p_788 ∨ break
c  in DIMACS:
 5828 -5829  5830 -788 1162 0


c  2-1 --> 1
c    (-b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧ -p_788) -> (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0)
c  in CNF:
c     b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_2
c     b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_1
c     b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨  b^{2, 395}_0
c  in DIMACS:
 5828 -5829  5830  788 -5831 0
 5828 -5829  5830  788 -5832 0
 5828 -5829  5830  788  5833 0

c  1-1 --> 0
c    (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0 ∧ -p_788) -> (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧ -b^{2, 395}_0)
c  in CNF:
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_2
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_1
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_0
c  in DIMACS:
 5828  5829 -5830  788 -5831 0
 5828  5829 -5830  788 -5832 0
 5828  5829 -5830  788 -5833 0

c  0-1 --> -1
c    (-b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧ -p_788) -> ( b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0)
c  in CNF:
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨  b^{2, 395}_2
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_1
c     b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨  b^{2, 395}_0
c  in DIMACS:
 5828  5829  5830  788  5831 0
 5828  5829  5830  788 -5832 0
 5828  5829  5830  788  5833 0

c  -1-1 --> -2
c    ( b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧  b^{2, 394}_0 ∧ -p_788) -> ( b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0)
c  in CNF:
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨  b^{2, 395}_2
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨  b^{2, 395}_1
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨  p_788 ∨ -b^{2, 395}_0
c  in DIMACS:
-5828  5829 -5830  788  5831 0
-5828  5829 -5830  788  5832 0
-5828  5829 -5830  788 -5833 0

c  -2-1 --> break 
c    ( b^{2, 394}_2 ∧  b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧ -p_788) -> break
c  in CNF:
c    -b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨  b^{2, 394}_0 ∨  p_788 ∨ break
c  in DIMACS:
-5828 -5829  5830  788 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 394}_2 ∧ -b^{2, 394}_1 ∧ -b^{2, 394}_0 ∧ true) 
c  in CNF:
c    -b^{2, 394}_2 ∨  b^{2, 394}_1 ∨  b^{2, 394}_0 ∨ false 
c  in DIMACS:
-5828  5829  5830  0

c  3 does not represent an automaton state.
c    -(-b^{2, 394}_2 ∧  b^{2, 394}_1 ∧  b^{2, 394}_0 ∧ true) 
c  in CNF:
c     b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ false 
c  in DIMACS:
 5828 -5829 -5830  0
c  -3 does not represent an automaton state.
c    -( b^{2, 394}_2 ∧  b^{2, 394}_1 ∧  b^{2, 394}_0 ∧ true) 
c  in CNF:
c    -b^{2, 394}_2 ∨ -b^{2, 394}_1 ∨ -b^{2, 394}_0 ∨ false 
c  in DIMACS:
-5828 -5829 -5830  0

c i = 395
c  -2+1 --> -1
c    ( b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧  p_790) -> ( b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0)
c  in CNF:
c    -b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨  b^{2, 396}_2
c    -b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_1
c    -b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨  b^{2, 396}_0
c  in DIMACS:
-5831 -5832  5833 -790  5834 0
-5831 -5832  5833 -790 -5835 0
-5831 -5832  5833 -790  5836 0

c  -1+1 --> 0
c    ( b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0 ∧  p_790) -> (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧ -b^{2, 396}_0)
c  in CNF:
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_2
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_1
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_0
c  in DIMACS:
-5831  5832 -5833 -790 -5834 0
-5831  5832 -5833 -790 -5835 0
-5831  5832 -5833 -790 -5836 0

c  0+1 --> 1
c    (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧  p_790) -> (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0)
c  in CNF:
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_2
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_1
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨  b^{2, 396}_0
c  in DIMACS:
 5831  5832  5833 -790 -5834 0
 5831  5832  5833 -790 -5835 0
 5831  5832  5833 -790  5836 0

c  1+1 --> 2
c    (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0 ∧  p_790) -> (-b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0)
c  in CNF:
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_2
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨  b^{2, 396}_1
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ -p_790 ∨ -b^{2, 396}_0
c  in DIMACS:
 5831  5832 -5833 -790 -5834 0
 5831  5832 -5833 -790  5835 0
 5831  5832 -5833 -790 -5836 0

c  2+1 --> break 
c    (-b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧  p_790) -> break
c  in CNF:
c     b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 5831 -5832  5833 -790 1162 0


c  2-1 --> 1
c    (-b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧ -p_790) -> (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0)
c  in CNF:
c     b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_2
c     b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_1
c     b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨  b^{2, 396}_0
c  in DIMACS:
 5831 -5832  5833  790 -5834 0
 5831 -5832  5833  790 -5835 0
 5831 -5832  5833  790  5836 0

c  1-1 --> 0
c    (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0 ∧ -p_790) -> (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧ -b^{2, 396}_0)
c  in CNF:
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_2
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_1
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_0
c  in DIMACS:
 5831  5832 -5833  790 -5834 0
 5831  5832 -5833  790 -5835 0
 5831  5832 -5833  790 -5836 0

c  0-1 --> -1
c    (-b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧ -p_790) -> ( b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0)
c  in CNF:
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨  b^{2, 396}_2
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_1
c     b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨  b^{2, 396}_0
c  in DIMACS:
 5831  5832  5833  790  5834 0
 5831  5832  5833  790 -5835 0
 5831  5832  5833  790  5836 0

c  -1-1 --> -2
c    ( b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧  b^{2, 395}_0 ∧ -p_790) -> ( b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0)
c  in CNF:
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨  b^{2, 396}_2
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨  b^{2, 396}_1
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨  p_790 ∨ -b^{2, 396}_0
c  in DIMACS:
-5831  5832 -5833  790  5834 0
-5831  5832 -5833  790  5835 0
-5831  5832 -5833  790 -5836 0

c  -2-1 --> break 
c    ( b^{2, 395}_2 ∧  b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨  b^{2, 395}_0 ∨  p_790 ∨ break
c  in DIMACS:
-5831 -5832  5833  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 395}_2 ∧ -b^{2, 395}_1 ∧ -b^{2, 395}_0 ∧ true) 
c  in CNF:
c    -b^{2, 395}_2 ∨  b^{2, 395}_1 ∨  b^{2, 395}_0 ∨ false 
c  in DIMACS:
-5831  5832  5833  0

c  3 does not represent an automaton state.
c    -(-b^{2, 395}_2 ∧  b^{2, 395}_1 ∧  b^{2, 395}_0 ∧ true) 
c  in CNF:
c     b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ false 
c  in DIMACS:
 5831 -5832 -5833  0
c  -3 does not represent an automaton state.
c    -( b^{2, 395}_2 ∧  b^{2, 395}_1 ∧  b^{2, 395}_0 ∧ true) 
c  in CNF:
c    -b^{2, 395}_2 ∨ -b^{2, 395}_1 ∨ -b^{2, 395}_0 ∨ false 
c  in DIMACS:
-5831 -5832 -5833  0

c i = 396
c  -2+1 --> -1
c    ( b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧  p_792) -> ( b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0)
c  in CNF:
c    -b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨  b^{2, 397}_2
c    -b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_1
c    -b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨  b^{2, 397}_0
c  in DIMACS:
-5834 -5835  5836 -792  5837 0
-5834 -5835  5836 -792 -5838 0
-5834 -5835  5836 -792  5839 0

c  -1+1 --> 0
c    ( b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0 ∧  p_792) -> (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧ -b^{2, 397}_0)
c  in CNF:
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_2
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_1
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_0
c  in DIMACS:
-5834  5835 -5836 -792 -5837 0
-5834  5835 -5836 -792 -5838 0
-5834  5835 -5836 -792 -5839 0

c  0+1 --> 1
c    (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧  p_792) -> (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0)
c  in CNF:
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_2
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_1
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨  b^{2, 397}_0
c  in DIMACS:
 5834  5835  5836 -792 -5837 0
 5834  5835  5836 -792 -5838 0
 5834  5835  5836 -792  5839 0

c  1+1 --> 2
c    (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0 ∧  p_792) -> (-b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0)
c  in CNF:
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_2
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨  b^{2, 397}_1
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ -p_792 ∨ -b^{2, 397}_0
c  in DIMACS:
 5834  5835 -5836 -792 -5837 0
 5834  5835 -5836 -792  5838 0
 5834  5835 -5836 -792 -5839 0

c  2+1 --> break 
c    (-b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧  p_792) -> break
c  in CNF:
c     b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 5834 -5835  5836 -792 1162 0


c  2-1 --> 1
c    (-b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧ -p_792) -> (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0)
c  in CNF:
c     b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_2
c     b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_1
c     b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨  b^{2, 397}_0
c  in DIMACS:
 5834 -5835  5836  792 -5837 0
 5834 -5835  5836  792 -5838 0
 5834 -5835  5836  792  5839 0

c  1-1 --> 0
c    (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0 ∧ -p_792) -> (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧ -b^{2, 397}_0)
c  in CNF:
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_2
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_1
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_0
c  in DIMACS:
 5834  5835 -5836  792 -5837 0
 5834  5835 -5836  792 -5838 0
 5834  5835 -5836  792 -5839 0

c  0-1 --> -1
c    (-b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧ -p_792) -> ( b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0)
c  in CNF:
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨  b^{2, 397}_2
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_1
c     b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨  b^{2, 397}_0
c  in DIMACS:
 5834  5835  5836  792  5837 0
 5834  5835  5836  792 -5838 0
 5834  5835  5836  792  5839 0

c  -1-1 --> -2
c    ( b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧  b^{2, 396}_0 ∧ -p_792) -> ( b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0)
c  in CNF:
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨  b^{2, 397}_2
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨  b^{2, 397}_1
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨  p_792 ∨ -b^{2, 397}_0
c  in DIMACS:
-5834  5835 -5836  792  5837 0
-5834  5835 -5836  792  5838 0
-5834  5835 -5836  792 -5839 0

c  -2-1 --> break 
c    ( b^{2, 396}_2 ∧  b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨  b^{2, 396}_0 ∨  p_792 ∨ break
c  in DIMACS:
-5834 -5835  5836  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 396}_2 ∧ -b^{2, 396}_1 ∧ -b^{2, 396}_0 ∧ true) 
c  in CNF:
c    -b^{2, 396}_2 ∨  b^{2, 396}_1 ∨  b^{2, 396}_0 ∨ false 
c  in DIMACS:
-5834  5835  5836  0

c  3 does not represent an automaton state.
c    -(-b^{2, 396}_2 ∧  b^{2, 396}_1 ∧  b^{2, 396}_0 ∧ true) 
c  in CNF:
c     b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ false 
c  in DIMACS:
 5834 -5835 -5836  0
c  -3 does not represent an automaton state.
c    -( b^{2, 396}_2 ∧  b^{2, 396}_1 ∧  b^{2, 396}_0 ∧ true) 
c  in CNF:
c    -b^{2, 396}_2 ∨ -b^{2, 396}_1 ∨ -b^{2, 396}_0 ∨ false 
c  in DIMACS:
-5834 -5835 -5836  0

c i = 397
c  -2+1 --> -1
c    ( b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧  p_794) -> ( b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0)
c  in CNF:
c    -b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨  b^{2, 398}_2
c    -b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_1
c    -b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨  b^{2, 398}_0
c  in DIMACS:
-5837 -5838  5839 -794  5840 0
-5837 -5838  5839 -794 -5841 0
-5837 -5838  5839 -794  5842 0

c  -1+1 --> 0
c    ( b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0 ∧  p_794) -> (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧ -b^{2, 398}_0)
c  in CNF:
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_2
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_1
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_0
c  in DIMACS:
-5837  5838 -5839 -794 -5840 0
-5837  5838 -5839 -794 -5841 0
-5837  5838 -5839 -794 -5842 0

c  0+1 --> 1
c    (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧  p_794) -> (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0)
c  in CNF:
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_2
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_1
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨  b^{2, 398}_0
c  in DIMACS:
 5837  5838  5839 -794 -5840 0
 5837  5838  5839 -794 -5841 0
 5837  5838  5839 -794  5842 0

c  1+1 --> 2
c    (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0 ∧  p_794) -> (-b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0)
c  in CNF:
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_2
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨  b^{2, 398}_1
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ -p_794 ∨ -b^{2, 398}_0
c  in DIMACS:
 5837  5838 -5839 -794 -5840 0
 5837  5838 -5839 -794  5841 0
 5837  5838 -5839 -794 -5842 0

c  2+1 --> break 
c    (-b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧  p_794) -> break
c  in CNF:
c     b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ -p_794 ∨ break
c  in DIMACS:
 5837 -5838  5839 -794 1162 0


c  2-1 --> 1
c    (-b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧ -p_794) -> (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0)
c  in CNF:
c     b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_2
c     b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_1
c     b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨  b^{2, 398}_0
c  in DIMACS:
 5837 -5838  5839  794 -5840 0
 5837 -5838  5839  794 -5841 0
 5837 -5838  5839  794  5842 0

c  1-1 --> 0
c    (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0 ∧ -p_794) -> (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧ -b^{2, 398}_0)
c  in CNF:
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_2
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_1
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_0
c  in DIMACS:
 5837  5838 -5839  794 -5840 0
 5837  5838 -5839  794 -5841 0
 5837  5838 -5839  794 -5842 0

c  0-1 --> -1
c    (-b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧ -p_794) -> ( b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0)
c  in CNF:
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨  b^{2, 398}_2
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_1
c     b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨  b^{2, 398}_0
c  in DIMACS:
 5837  5838  5839  794  5840 0
 5837  5838  5839  794 -5841 0
 5837  5838  5839  794  5842 0

c  -1-1 --> -2
c    ( b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧  b^{2, 397}_0 ∧ -p_794) -> ( b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0)
c  in CNF:
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨  b^{2, 398}_2
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨  b^{2, 398}_1
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨  p_794 ∨ -b^{2, 398}_0
c  in DIMACS:
-5837  5838 -5839  794  5840 0
-5837  5838 -5839  794  5841 0
-5837  5838 -5839  794 -5842 0

c  -2-1 --> break 
c    ( b^{2, 397}_2 ∧  b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧ -p_794) -> break
c  in CNF:
c    -b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨  b^{2, 397}_0 ∨  p_794 ∨ break
c  in DIMACS:
-5837 -5838  5839  794 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 397}_2 ∧ -b^{2, 397}_1 ∧ -b^{2, 397}_0 ∧ true) 
c  in CNF:
c    -b^{2, 397}_2 ∨  b^{2, 397}_1 ∨  b^{2, 397}_0 ∨ false 
c  in DIMACS:
-5837  5838  5839  0

c  3 does not represent an automaton state.
c    -(-b^{2, 397}_2 ∧  b^{2, 397}_1 ∧  b^{2, 397}_0 ∧ true) 
c  in CNF:
c     b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ false 
c  in DIMACS:
 5837 -5838 -5839  0
c  -3 does not represent an automaton state.
c    -( b^{2, 397}_2 ∧  b^{2, 397}_1 ∧  b^{2, 397}_0 ∧ true) 
c  in CNF:
c    -b^{2, 397}_2 ∨ -b^{2, 397}_1 ∨ -b^{2, 397}_0 ∨ false 
c  in DIMACS:
-5837 -5838 -5839  0

c i = 398
c  -2+1 --> -1
c    ( b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧  p_796) -> ( b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0)
c  in CNF:
c    -b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨  b^{2, 399}_2
c    -b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_1
c    -b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨  b^{2, 399}_0
c  in DIMACS:
-5840 -5841  5842 -796  5843 0
-5840 -5841  5842 -796 -5844 0
-5840 -5841  5842 -796  5845 0

c  -1+1 --> 0
c    ( b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0 ∧  p_796) -> (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧ -b^{2, 399}_0)
c  in CNF:
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_2
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_1
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_0
c  in DIMACS:
-5840  5841 -5842 -796 -5843 0
-5840  5841 -5842 -796 -5844 0
-5840  5841 -5842 -796 -5845 0

c  0+1 --> 1
c    (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧  p_796) -> (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0)
c  in CNF:
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_2
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_1
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨  b^{2, 399}_0
c  in DIMACS:
 5840  5841  5842 -796 -5843 0
 5840  5841  5842 -796 -5844 0
 5840  5841  5842 -796  5845 0

c  1+1 --> 2
c    (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0 ∧  p_796) -> (-b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0)
c  in CNF:
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_2
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨  b^{2, 399}_1
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ -p_796 ∨ -b^{2, 399}_0
c  in DIMACS:
 5840  5841 -5842 -796 -5843 0
 5840  5841 -5842 -796  5844 0
 5840  5841 -5842 -796 -5845 0

c  2+1 --> break 
c    (-b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧  p_796) -> break
c  in CNF:
c     b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ -p_796 ∨ break
c  in DIMACS:
 5840 -5841  5842 -796 1162 0


c  2-1 --> 1
c    (-b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧ -p_796) -> (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0)
c  in CNF:
c     b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_2
c     b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_1
c     b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨  b^{2, 399}_0
c  in DIMACS:
 5840 -5841  5842  796 -5843 0
 5840 -5841  5842  796 -5844 0
 5840 -5841  5842  796  5845 0

c  1-1 --> 0
c    (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0 ∧ -p_796) -> (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧ -b^{2, 399}_0)
c  in CNF:
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_2
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_1
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_0
c  in DIMACS:
 5840  5841 -5842  796 -5843 0
 5840  5841 -5842  796 -5844 0
 5840  5841 -5842  796 -5845 0

c  0-1 --> -1
c    (-b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧ -p_796) -> ( b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0)
c  in CNF:
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨  b^{2, 399}_2
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_1
c     b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨  b^{2, 399}_0
c  in DIMACS:
 5840  5841  5842  796  5843 0
 5840  5841  5842  796 -5844 0
 5840  5841  5842  796  5845 0

c  -1-1 --> -2
c    ( b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧  b^{2, 398}_0 ∧ -p_796) -> ( b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0)
c  in CNF:
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨  b^{2, 399}_2
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨  b^{2, 399}_1
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨  p_796 ∨ -b^{2, 399}_0
c  in DIMACS:
-5840  5841 -5842  796  5843 0
-5840  5841 -5842  796  5844 0
-5840  5841 -5842  796 -5845 0

c  -2-1 --> break 
c    ( b^{2, 398}_2 ∧  b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧ -p_796) -> break
c  in CNF:
c    -b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨  b^{2, 398}_0 ∨  p_796 ∨ break
c  in DIMACS:
-5840 -5841  5842  796 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 398}_2 ∧ -b^{2, 398}_1 ∧ -b^{2, 398}_0 ∧ true) 
c  in CNF:
c    -b^{2, 398}_2 ∨  b^{2, 398}_1 ∨  b^{2, 398}_0 ∨ false 
c  in DIMACS:
-5840  5841  5842  0

c  3 does not represent an automaton state.
c    -(-b^{2, 398}_2 ∧  b^{2, 398}_1 ∧  b^{2, 398}_0 ∧ true) 
c  in CNF:
c     b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ false 
c  in DIMACS:
 5840 -5841 -5842  0
c  -3 does not represent an automaton state.
c    -( b^{2, 398}_2 ∧  b^{2, 398}_1 ∧  b^{2, 398}_0 ∧ true) 
c  in CNF:
c    -b^{2, 398}_2 ∨ -b^{2, 398}_1 ∨ -b^{2, 398}_0 ∨ false 
c  in DIMACS:
-5840 -5841 -5842  0

c i = 399
c  -2+1 --> -1
c    ( b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧  p_798) -> ( b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0)
c  in CNF:
c    -b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨  b^{2, 400}_2
c    -b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_1
c    -b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨  b^{2, 400}_0
c  in DIMACS:
-5843 -5844  5845 -798  5846 0
-5843 -5844  5845 -798 -5847 0
-5843 -5844  5845 -798  5848 0

c  -1+1 --> 0
c    ( b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0 ∧  p_798) -> (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧ -b^{2, 400}_0)
c  in CNF:
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_2
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_1
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_0
c  in DIMACS:
-5843  5844 -5845 -798 -5846 0
-5843  5844 -5845 -798 -5847 0
-5843  5844 -5845 -798 -5848 0

c  0+1 --> 1
c    (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧  p_798) -> (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0)
c  in CNF:
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_2
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_1
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨  b^{2, 400}_0
c  in DIMACS:
 5843  5844  5845 -798 -5846 0
 5843  5844  5845 -798 -5847 0
 5843  5844  5845 -798  5848 0

c  1+1 --> 2
c    (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0 ∧  p_798) -> (-b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0)
c  in CNF:
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_2
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨  b^{2, 400}_1
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ -p_798 ∨ -b^{2, 400}_0
c  in DIMACS:
 5843  5844 -5845 -798 -5846 0
 5843  5844 -5845 -798  5847 0
 5843  5844 -5845 -798 -5848 0

c  2+1 --> break 
c    (-b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧  p_798) -> break
c  in CNF:
c     b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 5843 -5844  5845 -798 1162 0


c  2-1 --> 1
c    (-b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧ -p_798) -> (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0)
c  in CNF:
c     b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_2
c     b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_1
c     b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨  b^{2, 400}_0
c  in DIMACS:
 5843 -5844  5845  798 -5846 0
 5843 -5844  5845  798 -5847 0
 5843 -5844  5845  798  5848 0

c  1-1 --> 0
c    (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0 ∧ -p_798) -> (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧ -b^{2, 400}_0)
c  in CNF:
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_2
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_1
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_0
c  in DIMACS:
 5843  5844 -5845  798 -5846 0
 5843  5844 -5845  798 -5847 0
 5843  5844 -5845  798 -5848 0

c  0-1 --> -1
c    (-b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧ -p_798) -> ( b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0)
c  in CNF:
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨  b^{2, 400}_2
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_1
c     b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨  b^{2, 400}_0
c  in DIMACS:
 5843  5844  5845  798  5846 0
 5843  5844  5845  798 -5847 0
 5843  5844  5845  798  5848 0

c  -1-1 --> -2
c    ( b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧  b^{2, 399}_0 ∧ -p_798) -> ( b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0)
c  in CNF:
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨  b^{2, 400}_2
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨  b^{2, 400}_1
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨  p_798 ∨ -b^{2, 400}_0
c  in DIMACS:
-5843  5844 -5845  798  5846 0
-5843  5844 -5845  798  5847 0
-5843  5844 -5845  798 -5848 0

c  -2-1 --> break 
c    ( b^{2, 399}_2 ∧  b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨  b^{2, 399}_0 ∨  p_798 ∨ break
c  in DIMACS:
-5843 -5844  5845  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 399}_2 ∧ -b^{2, 399}_1 ∧ -b^{2, 399}_0 ∧ true) 
c  in CNF:
c    -b^{2, 399}_2 ∨  b^{2, 399}_1 ∨  b^{2, 399}_0 ∨ false 
c  in DIMACS:
-5843  5844  5845  0

c  3 does not represent an automaton state.
c    -(-b^{2, 399}_2 ∧  b^{2, 399}_1 ∧  b^{2, 399}_0 ∧ true) 
c  in CNF:
c     b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ false 
c  in DIMACS:
 5843 -5844 -5845  0
c  -3 does not represent an automaton state.
c    -( b^{2, 399}_2 ∧  b^{2, 399}_1 ∧  b^{2, 399}_0 ∧ true) 
c  in CNF:
c    -b^{2, 399}_2 ∨ -b^{2, 399}_1 ∨ -b^{2, 399}_0 ∨ false 
c  in DIMACS:
-5843 -5844 -5845  0

c i = 400
c  -2+1 --> -1
c    ( b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧  p_800) -> ( b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0)
c  in CNF:
c    -b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨  b^{2, 401}_2
c    -b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_1
c    -b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨  b^{2, 401}_0
c  in DIMACS:
-5846 -5847  5848 -800  5849 0
-5846 -5847  5848 -800 -5850 0
-5846 -5847  5848 -800  5851 0

c  -1+1 --> 0
c    ( b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0 ∧  p_800) -> (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧ -b^{2, 401}_0)
c  in CNF:
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_2
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_1
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_0
c  in DIMACS:
-5846  5847 -5848 -800 -5849 0
-5846  5847 -5848 -800 -5850 0
-5846  5847 -5848 -800 -5851 0

c  0+1 --> 1
c    (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧  p_800) -> (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0)
c  in CNF:
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_2
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_1
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨  b^{2, 401}_0
c  in DIMACS:
 5846  5847  5848 -800 -5849 0
 5846  5847  5848 -800 -5850 0
 5846  5847  5848 -800  5851 0

c  1+1 --> 2
c    (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0 ∧  p_800) -> (-b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0)
c  in CNF:
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_2
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨  b^{2, 401}_1
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ -p_800 ∨ -b^{2, 401}_0
c  in DIMACS:
 5846  5847 -5848 -800 -5849 0
 5846  5847 -5848 -800  5850 0
 5846  5847 -5848 -800 -5851 0

c  2+1 --> break 
c    (-b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧  p_800) -> break
c  in CNF:
c     b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 5846 -5847  5848 -800 1162 0


c  2-1 --> 1
c    (-b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧ -p_800) -> (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0)
c  in CNF:
c     b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_2
c     b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_1
c     b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨  b^{2, 401}_0
c  in DIMACS:
 5846 -5847  5848  800 -5849 0
 5846 -5847  5848  800 -5850 0
 5846 -5847  5848  800  5851 0

c  1-1 --> 0
c    (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0 ∧ -p_800) -> (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧ -b^{2, 401}_0)
c  in CNF:
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_2
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_1
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_0
c  in DIMACS:
 5846  5847 -5848  800 -5849 0
 5846  5847 -5848  800 -5850 0
 5846  5847 -5848  800 -5851 0

c  0-1 --> -1
c    (-b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧ -p_800) -> ( b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0)
c  in CNF:
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨  b^{2, 401}_2
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_1
c     b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨  b^{2, 401}_0
c  in DIMACS:
 5846  5847  5848  800  5849 0
 5846  5847  5848  800 -5850 0
 5846  5847  5848  800  5851 0

c  -1-1 --> -2
c    ( b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧  b^{2, 400}_0 ∧ -p_800) -> ( b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0)
c  in CNF:
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨  b^{2, 401}_2
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨  b^{2, 401}_1
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨  p_800 ∨ -b^{2, 401}_0
c  in DIMACS:
-5846  5847 -5848  800  5849 0
-5846  5847 -5848  800  5850 0
-5846  5847 -5848  800 -5851 0

c  -2-1 --> break 
c    ( b^{2, 400}_2 ∧  b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨  b^{2, 400}_0 ∨  p_800 ∨ break
c  in DIMACS:
-5846 -5847  5848  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 400}_2 ∧ -b^{2, 400}_1 ∧ -b^{2, 400}_0 ∧ true) 
c  in CNF:
c    -b^{2, 400}_2 ∨  b^{2, 400}_1 ∨  b^{2, 400}_0 ∨ false 
c  in DIMACS:
-5846  5847  5848  0

c  3 does not represent an automaton state.
c    -(-b^{2, 400}_2 ∧  b^{2, 400}_1 ∧  b^{2, 400}_0 ∧ true) 
c  in CNF:
c     b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ false 
c  in DIMACS:
 5846 -5847 -5848  0
c  -3 does not represent an automaton state.
c    -( b^{2, 400}_2 ∧  b^{2, 400}_1 ∧  b^{2, 400}_0 ∧ true) 
c  in CNF:
c    -b^{2, 400}_2 ∨ -b^{2, 400}_1 ∨ -b^{2, 400}_0 ∨ false 
c  in DIMACS:
-5846 -5847 -5848  0

c i = 401
c  -2+1 --> -1
c    ( b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧  p_802) -> ( b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0)
c  in CNF:
c    -b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨  b^{2, 402}_2
c    -b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_1
c    -b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨  b^{2, 402}_0
c  in DIMACS:
-5849 -5850  5851 -802  5852 0
-5849 -5850  5851 -802 -5853 0
-5849 -5850  5851 -802  5854 0

c  -1+1 --> 0
c    ( b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0 ∧  p_802) -> (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧ -b^{2, 402}_0)
c  in CNF:
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_2
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_1
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_0
c  in DIMACS:
-5849  5850 -5851 -802 -5852 0
-5849  5850 -5851 -802 -5853 0
-5849  5850 -5851 -802 -5854 0

c  0+1 --> 1
c    (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧  p_802) -> (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0)
c  in CNF:
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_2
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_1
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨  b^{2, 402}_0
c  in DIMACS:
 5849  5850  5851 -802 -5852 0
 5849  5850  5851 -802 -5853 0
 5849  5850  5851 -802  5854 0

c  1+1 --> 2
c    (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0 ∧  p_802) -> (-b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0)
c  in CNF:
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_2
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨  b^{2, 402}_1
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ -p_802 ∨ -b^{2, 402}_0
c  in DIMACS:
 5849  5850 -5851 -802 -5852 0
 5849  5850 -5851 -802  5853 0
 5849  5850 -5851 -802 -5854 0

c  2+1 --> break 
c    (-b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧  p_802) -> break
c  in CNF:
c     b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ -p_802 ∨ break
c  in DIMACS:
 5849 -5850  5851 -802 1162 0


c  2-1 --> 1
c    (-b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧ -p_802) -> (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0)
c  in CNF:
c     b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_2
c     b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_1
c     b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨  b^{2, 402}_0
c  in DIMACS:
 5849 -5850  5851  802 -5852 0
 5849 -5850  5851  802 -5853 0
 5849 -5850  5851  802  5854 0

c  1-1 --> 0
c    (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0 ∧ -p_802) -> (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧ -b^{2, 402}_0)
c  in CNF:
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_2
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_1
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_0
c  in DIMACS:
 5849  5850 -5851  802 -5852 0
 5849  5850 -5851  802 -5853 0
 5849  5850 -5851  802 -5854 0

c  0-1 --> -1
c    (-b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧ -p_802) -> ( b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0)
c  in CNF:
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨  b^{2, 402}_2
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_1
c     b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨  b^{2, 402}_0
c  in DIMACS:
 5849  5850  5851  802  5852 0
 5849  5850  5851  802 -5853 0
 5849  5850  5851  802  5854 0

c  -1-1 --> -2
c    ( b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧  b^{2, 401}_0 ∧ -p_802) -> ( b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0)
c  in CNF:
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨  b^{2, 402}_2
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨  b^{2, 402}_1
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨  p_802 ∨ -b^{2, 402}_0
c  in DIMACS:
-5849  5850 -5851  802  5852 0
-5849  5850 -5851  802  5853 0
-5849  5850 -5851  802 -5854 0

c  -2-1 --> break 
c    ( b^{2, 401}_2 ∧  b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧ -p_802) -> break
c  in CNF:
c    -b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨  b^{2, 401}_0 ∨  p_802 ∨ break
c  in DIMACS:
-5849 -5850  5851  802 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 401}_2 ∧ -b^{2, 401}_1 ∧ -b^{2, 401}_0 ∧ true) 
c  in CNF:
c    -b^{2, 401}_2 ∨  b^{2, 401}_1 ∨  b^{2, 401}_0 ∨ false 
c  in DIMACS:
-5849  5850  5851  0

c  3 does not represent an automaton state.
c    -(-b^{2, 401}_2 ∧  b^{2, 401}_1 ∧  b^{2, 401}_0 ∧ true) 
c  in CNF:
c     b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ false 
c  in DIMACS:
 5849 -5850 -5851  0
c  -3 does not represent an automaton state.
c    -( b^{2, 401}_2 ∧  b^{2, 401}_1 ∧  b^{2, 401}_0 ∧ true) 
c  in CNF:
c    -b^{2, 401}_2 ∨ -b^{2, 401}_1 ∨ -b^{2, 401}_0 ∨ false 
c  in DIMACS:
-5849 -5850 -5851  0

c i = 402
c  -2+1 --> -1
c    ( b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧  p_804) -> ( b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0)
c  in CNF:
c    -b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨  b^{2, 403}_2
c    -b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_1
c    -b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨  b^{2, 403}_0
c  in DIMACS:
-5852 -5853  5854 -804  5855 0
-5852 -5853  5854 -804 -5856 0
-5852 -5853  5854 -804  5857 0

c  -1+1 --> 0
c    ( b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0 ∧  p_804) -> (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧ -b^{2, 403}_0)
c  in CNF:
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_2
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_1
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_0
c  in DIMACS:
-5852  5853 -5854 -804 -5855 0
-5852  5853 -5854 -804 -5856 0
-5852  5853 -5854 -804 -5857 0

c  0+1 --> 1
c    (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧  p_804) -> (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0)
c  in CNF:
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_2
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_1
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨  b^{2, 403}_0
c  in DIMACS:
 5852  5853  5854 -804 -5855 0
 5852  5853  5854 -804 -5856 0
 5852  5853  5854 -804  5857 0

c  1+1 --> 2
c    (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0 ∧  p_804) -> (-b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0)
c  in CNF:
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_2
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨  b^{2, 403}_1
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ -p_804 ∨ -b^{2, 403}_0
c  in DIMACS:
 5852  5853 -5854 -804 -5855 0
 5852  5853 -5854 -804  5856 0
 5852  5853 -5854 -804 -5857 0

c  2+1 --> break 
c    (-b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧  p_804) -> break
c  in CNF:
c     b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 5852 -5853  5854 -804 1162 0


c  2-1 --> 1
c    (-b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧ -p_804) -> (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0)
c  in CNF:
c     b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_2
c     b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_1
c     b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨  b^{2, 403}_0
c  in DIMACS:
 5852 -5853  5854  804 -5855 0
 5852 -5853  5854  804 -5856 0
 5852 -5853  5854  804  5857 0

c  1-1 --> 0
c    (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0 ∧ -p_804) -> (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧ -b^{2, 403}_0)
c  in CNF:
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_2
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_1
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_0
c  in DIMACS:
 5852  5853 -5854  804 -5855 0
 5852  5853 -5854  804 -5856 0
 5852  5853 -5854  804 -5857 0

c  0-1 --> -1
c    (-b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧ -p_804) -> ( b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0)
c  in CNF:
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨  b^{2, 403}_2
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_1
c     b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨  b^{2, 403}_0
c  in DIMACS:
 5852  5853  5854  804  5855 0
 5852  5853  5854  804 -5856 0
 5852  5853  5854  804  5857 0

c  -1-1 --> -2
c    ( b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧  b^{2, 402}_0 ∧ -p_804) -> ( b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0)
c  in CNF:
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨  b^{2, 403}_2
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨  b^{2, 403}_1
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨  p_804 ∨ -b^{2, 403}_0
c  in DIMACS:
-5852  5853 -5854  804  5855 0
-5852  5853 -5854  804  5856 0
-5852  5853 -5854  804 -5857 0

c  -2-1 --> break 
c    ( b^{2, 402}_2 ∧  b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨  b^{2, 402}_0 ∨  p_804 ∨ break
c  in DIMACS:
-5852 -5853  5854  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 402}_2 ∧ -b^{2, 402}_1 ∧ -b^{2, 402}_0 ∧ true) 
c  in CNF:
c    -b^{2, 402}_2 ∨  b^{2, 402}_1 ∨  b^{2, 402}_0 ∨ false 
c  in DIMACS:
-5852  5853  5854  0

c  3 does not represent an automaton state.
c    -(-b^{2, 402}_2 ∧  b^{2, 402}_1 ∧  b^{2, 402}_0 ∧ true) 
c  in CNF:
c     b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ false 
c  in DIMACS:
 5852 -5853 -5854  0
c  -3 does not represent an automaton state.
c    -( b^{2, 402}_2 ∧  b^{2, 402}_1 ∧  b^{2, 402}_0 ∧ true) 
c  in CNF:
c    -b^{2, 402}_2 ∨ -b^{2, 402}_1 ∨ -b^{2, 402}_0 ∨ false 
c  in DIMACS:
-5852 -5853 -5854  0

c i = 403
c  -2+1 --> -1
c    ( b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧  p_806) -> ( b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0)
c  in CNF:
c    -b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨  b^{2, 404}_2
c    -b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_1
c    -b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨  b^{2, 404}_0
c  in DIMACS:
-5855 -5856  5857 -806  5858 0
-5855 -5856  5857 -806 -5859 0
-5855 -5856  5857 -806  5860 0

c  -1+1 --> 0
c    ( b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0 ∧  p_806) -> (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧ -b^{2, 404}_0)
c  in CNF:
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_2
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_1
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_0
c  in DIMACS:
-5855  5856 -5857 -806 -5858 0
-5855  5856 -5857 -806 -5859 0
-5855  5856 -5857 -806 -5860 0

c  0+1 --> 1
c    (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧  p_806) -> (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0)
c  in CNF:
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_2
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_1
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨  b^{2, 404}_0
c  in DIMACS:
 5855  5856  5857 -806 -5858 0
 5855  5856  5857 -806 -5859 0
 5855  5856  5857 -806  5860 0

c  1+1 --> 2
c    (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0 ∧  p_806) -> (-b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0)
c  in CNF:
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_2
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨  b^{2, 404}_1
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ -p_806 ∨ -b^{2, 404}_0
c  in DIMACS:
 5855  5856 -5857 -806 -5858 0
 5855  5856 -5857 -806  5859 0
 5855  5856 -5857 -806 -5860 0

c  2+1 --> break 
c    (-b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧  p_806) -> break
c  in CNF:
c     b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 5855 -5856  5857 -806 1162 0


c  2-1 --> 1
c    (-b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧ -p_806) -> (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0)
c  in CNF:
c     b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_2
c     b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_1
c     b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨  b^{2, 404}_0
c  in DIMACS:
 5855 -5856  5857  806 -5858 0
 5855 -5856  5857  806 -5859 0
 5855 -5856  5857  806  5860 0

c  1-1 --> 0
c    (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0 ∧ -p_806) -> (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧ -b^{2, 404}_0)
c  in CNF:
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_2
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_1
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_0
c  in DIMACS:
 5855  5856 -5857  806 -5858 0
 5855  5856 -5857  806 -5859 0
 5855  5856 -5857  806 -5860 0

c  0-1 --> -1
c    (-b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧ -p_806) -> ( b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0)
c  in CNF:
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨  b^{2, 404}_2
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_1
c     b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨  b^{2, 404}_0
c  in DIMACS:
 5855  5856  5857  806  5858 0
 5855  5856  5857  806 -5859 0
 5855  5856  5857  806  5860 0

c  -1-1 --> -2
c    ( b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧  b^{2, 403}_0 ∧ -p_806) -> ( b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0)
c  in CNF:
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨  b^{2, 404}_2
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨  b^{2, 404}_1
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨  p_806 ∨ -b^{2, 404}_0
c  in DIMACS:
-5855  5856 -5857  806  5858 0
-5855  5856 -5857  806  5859 0
-5855  5856 -5857  806 -5860 0

c  -2-1 --> break 
c    ( b^{2, 403}_2 ∧  b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨  b^{2, 403}_0 ∨  p_806 ∨ break
c  in DIMACS:
-5855 -5856  5857  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 403}_2 ∧ -b^{2, 403}_1 ∧ -b^{2, 403}_0 ∧ true) 
c  in CNF:
c    -b^{2, 403}_2 ∨  b^{2, 403}_1 ∨  b^{2, 403}_0 ∨ false 
c  in DIMACS:
-5855  5856  5857  0

c  3 does not represent an automaton state.
c    -(-b^{2, 403}_2 ∧  b^{2, 403}_1 ∧  b^{2, 403}_0 ∧ true) 
c  in CNF:
c     b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ false 
c  in DIMACS:
 5855 -5856 -5857  0
c  -3 does not represent an automaton state.
c    -( b^{2, 403}_2 ∧  b^{2, 403}_1 ∧  b^{2, 403}_0 ∧ true) 
c  in CNF:
c    -b^{2, 403}_2 ∨ -b^{2, 403}_1 ∨ -b^{2, 403}_0 ∨ false 
c  in DIMACS:
-5855 -5856 -5857  0

c i = 404
c  -2+1 --> -1
c    ( b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧  p_808) -> ( b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0)
c  in CNF:
c    -b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨  b^{2, 405}_2
c    -b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_1
c    -b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨  b^{2, 405}_0
c  in DIMACS:
-5858 -5859  5860 -808  5861 0
-5858 -5859  5860 -808 -5862 0
-5858 -5859  5860 -808  5863 0

c  -1+1 --> 0
c    ( b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0 ∧  p_808) -> (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧ -b^{2, 405}_0)
c  in CNF:
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_2
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_1
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_0
c  in DIMACS:
-5858  5859 -5860 -808 -5861 0
-5858  5859 -5860 -808 -5862 0
-5858  5859 -5860 -808 -5863 0

c  0+1 --> 1
c    (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧  p_808) -> (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0)
c  in CNF:
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_2
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_1
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨  b^{2, 405}_0
c  in DIMACS:
 5858  5859  5860 -808 -5861 0
 5858  5859  5860 -808 -5862 0
 5858  5859  5860 -808  5863 0

c  1+1 --> 2
c    (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0 ∧  p_808) -> (-b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0)
c  in CNF:
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_2
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨  b^{2, 405}_1
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ -p_808 ∨ -b^{2, 405}_0
c  in DIMACS:
 5858  5859 -5860 -808 -5861 0
 5858  5859 -5860 -808  5862 0
 5858  5859 -5860 -808 -5863 0

c  2+1 --> break 
c    (-b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧  p_808) -> break
c  in CNF:
c     b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 5858 -5859  5860 -808 1162 0


c  2-1 --> 1
c    (-b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧ -p_808) -> (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0)
c  in CNF:
c     b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_2
c     b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_1
c     b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨  b^{2, 405}_0
c  in DIMACS:
 5858 -5859  5860  808 -5861 0
 5858 -5859  5860  808 -5862 0
 5858 -5859  5860  808  5863 0

c  1-1 --> 0
c    (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0 ∧ -p_808) -> (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧ -b^{2, 405}_0)
c  in CNF:
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_2
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_1
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_0
c  in DIMACS:
 5858  5859 -5860  808 -5861 0
 5858  5859 -5860  808 -5862 0
 5858  5859 -5860  808 -5863 0

c  0-1 --> -1
c    (-b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧ -p_808) -> ( b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0)
c  in CNF:
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨  b^{2, 405}_2
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_1
c     b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨  b^{2, 405}_0
c  in DIMACS:
 5858  5859  5860  808  5861 0
 5858  5859  5860  808 -5862 0
 5858  5859  5860  808  5863 0

c  -1-1 --> -2
c    ( b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧  b^{2, 404}_0 ∧ -p_808) -> ( b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0)
c  in CNF:
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨  b^{2, 405}_2
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨  b^{2, 405}_1
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨  p_808 ∨ -b^{2, 405}_0
c  in DIMACS:
-5858  5859 -5860  808  5861 0
-5858  5859 -5860  808  5862 0
-5858  5859 -5860  808 -5863 0

c  -2-1 --> break 
c    ( b^{2, 404}_2 ∧  b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨  b^{2, 404}_0 ∨  p_808 ∨ break
c  in DIMACS:
-5858 -5859  5860  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 404}_2 ∧ -b^{2, 404}_1 ∧ -b^{2, 404}_0 ∧ true) 
c  in CNF:
c    -b^{2, 404}_2 ∨  b^{2, 404}_1 ∨  b^{2, 404}_0 ∨ false 
c  in DIMACS:
-5858  5859  5860  0

c  3 does not represent an automaton state.
c    -(-b^{2, 404}_2 ∧  b^{2, 404}_1 ∧  b^{2, 404}_0 ∧ true) 
c  in CNF:
c     b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ false 
c  in DIMACS:
 5858 -5859 -5860  0
c  -3 does not represent an automaton state.
c    -( b^{2, 404}_2 ∧  b^{2, 404}_1 ∧  b^{2, 404}_0 ∧ true) 
c  in CNF:
c    -b^{2, 404}_2 ∨ -b^{2, 404}_1 ∨ -b^{2, 404}_0 ∨ false 
c  in DIMACS:
-5858 -5859 -5860  0

c i = 405
c  -2+1 --> -1
c    ( b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧  p_810) -> ( b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0)
c  in CNF:
c    -b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨  b^{2, 406}_2
c    -b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_1
c    -b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨  b^{2, 406}_0
c  in DIMACS:
-5861 -5862  5863 -810  5864 0
-5861 -5862  5863 -810 -5865 0
-5861 -5862  5863 -810  5866 0

c  -1+1 --> 0
c    ( b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0 ∧  p_810) -> (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧ -b^{2, 406}_0)
c  in CNF:
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_2
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_1
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_0
c  in DIMACS:
-5861  5862 -5863 -810 -5864 0
-5861  5862 -5863 -810 -5865 0
-5861  5862 -5863 -810 -5866 0

c  0+1 --> 1
c    (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧  p_810) -> (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0)
c  in CNF:
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_2
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_1
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨  b^{2, 406}_0
c  in DIMACS:
 5861  5862  5863 -810 -5864 0
 5861  5862  5863 -810 -5865 0
 5861  5862  5863 -810  5866 0

c  1+1 --> 2
c    (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0 ∧  p_810) -> (-b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0)
c  in CNF:
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_2
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨  b^{2, 406}_1
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ -p_810 ∨ -b^{2, 406}_0
c  in DIMACS:
 5861  5862 -5863 -810 -5864 0
 5861  5862 -5863 -810  5865 0
 5861  5862 -5863 -810 -5866 0

c  2+1 --> break 
c    (-b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧  p_810) -> break
c  in CNF:
c     b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 5861 -5862  5863 -810 1162 0


c  2-1 --> 1
c    (-b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧ -p_810) -> (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0)
c  in CNF:
c     b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_2
c     b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_1
c     b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨  b^{2, 406}_0
c  in DIMACS:
 5861 -5862  5863  810 -5864 0
 5861 -5862  5863  810 -5865 0
 5861 -5862  5863  810  5866 0

c  1-1 --> 0
c    (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0 ∧ -p_810) -> (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧ -b^{2, 406}_0)
c  in CNF:
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_2
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_1
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_0
c  in DIMACS:
 5861  5862 -5863  810 -5864 0
 5861  5862 -5863  810 -5865 0
 5861  5862 -5863  810 -5866 0

c  0-1 --> -1
c    (-b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧ -p_810) -> ( b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0)
c  in CNF:
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨  b^{2, 406}_2
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_1
c     b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨  b^{2, 406}_0
c  in DIMACS:
 5861  5862  5863  810  5864 0
 5861  5862  5863  810 -5865 0
 5861  5862  5863  810  5866 0

c  -1-1 --> -2
c    ( b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧  b^{2, 405}_0 ∧ -p_810) -> ( b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0)
c  in CNF:
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨  b^{2, 406}_2
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨  b^{2, 406}_1
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨  p_810 ∨ -b^{2, 406}_0
c  in DIMACS:
-5861  5862 -5863  810  5864 0
-5861  5862 -5863  810  5865 0
-5861  5862 -5863  810 -5866 0

c  -2-1 --> break 
c    ( b^{2, 405}_2 ∧  b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨  b^{2, 405}_0 ∨  p_810 ∨ break
c  in DIMACS:
-5861 -5862  5863  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 405}_2 ∧ -b^{2, 405}_1 ∧ -b^{2, 405}_0 ∧ true) 
c  in CNF:
c    -b^{2, 405}_2 ∨  b^{2, 405}_1 ∨  b^{2, 405}_0 ∨ false 
c  in DIMACS:
-5861  5862  5863  0

c  3 does not represent an automaton state.
c    -(-b^{2, 405}_2 ∧  b^{2, 405}_1 ∧  b^{2, 405}_0 ∧ true) 
c  in CNF:
c     b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ false 
c  in DIMACS:
 5861 -5862 -5863  0
c  -3 does not represent an automaton state.
c    -( b^{2, 405}_2 ∧  b^{2, 405}_1 ∧  b^{2, 405}_0 ∧ true) 
c  in CNF:
c    -b^{2, 405}_2 ∨ -b^{2, 405}_1 ∨ -b^{2, 405}_0 ∨ false 
c  in DIMACS:
-5861 -5862 -5863  0

c i = 406
c  -2+1 --> -1
c    ( b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧  p_812) -> ( b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0)
c  in CNF:
c    -b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨  b^{2, 407}_2
c    -b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_1
c    -b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨  b^{2, 407}_0
c  in DIMACS:
-5864 -5865  5866 -812  5867 0
-5864 -5865  5866 -812 -5868 0
-5864 -5865  5866 -812  5869 0

c  -1+1 --> 0
c    ( b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0 ∧  p_812) -> (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧ -b^{2, 407}_0)
c  in CNF:
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_2
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_1
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_0
c  in DIMACS:
-5864  5865 -5866 -812 -5867 0
-5864  5865 -5866 -812 -5868 0
-5864  5865 -5866 -812 -5869 0

c  0+1 --> 1
c    (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧  p_812) -> (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0)
c  in CNF:
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_2
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_1
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨  b^{2, 407}_0
c  in DIMACS:
 5864  5865  5866 -812 -5867 0
 5864  5865  5866 -812 -5868 0
 5864  5865  5866 -812  5869 0

c  1+1 --> 2
c    (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0 ∧  p_812) -> (-b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0)
c  in CNF:
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_2
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨  b^{2, 407}_1
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ -p_812 ∨ -b^{2, 407}_0
c  in DIMACS:
 5864  5865 -5866 -812 -5867 0
 5864  5865 -5866 -812  5868 0
 5864  5865 -5866 -812 -5869 0

c  2+1 --> break 
c    (-b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧  p_812) -> break
c  in CNF:
c     b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 5864 -5865  5866 -812 1162 0


c  2-1 --> 1
c    (-b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧ -p_812) -> (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0)
c  in CNF:
c     b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_2
c     b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_1
c     b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨  b^{2, 407}_0
c  in DIMACS:
 5864 -5865  5866  812 -5867 0
 5864 -5865  5866  812 -5868 0
 5864 -5865  5866  812  5869 0

c  1-1 --> 0
c    (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0 ∧ -p_812) -> (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧ -b^{2, 407}_0)
c  in CNF:
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_2
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_1
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_0
c  in DIMACS:
 5864  5865 -5866  812 -5867 0
 5864  5865 -5866  812 -5868 0
 5864  5865 -5866  812 -5869 0

c  0-1 --> -1
c    (-b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧ -p_812) -> ( b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0)
c  in CNF:
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨  b^{2, 407}_2
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_1
c     b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨  b^{2, 407}_0
c  in DIMACS:
 5864  5865  5866  812  5867 0
 5864  5865  5866  812 -5868 0
 5864  5865  5866  812  5869 0

c  -1-1 --> -2
c    ( b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧  b^{2, 406}_0 ∧ -p_812) -> ( b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0)
c  in CNF:
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨  b^{2, 407}_2
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨  b^{2, 407}_1
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨  p_812 ∨ -b^{2, 407}_0
c  in DIMACS:
-5864  5865 -5866  812  5867 0
-5864  5865 -5866  812  5868 0
-5864  5865 -5866  812 -5869 0

c  -2-1 --> break 
c    ( b^{2, 406}_2 ∧  b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨  b^{2, 406}_0 ∨  p_812 ∨ break
c  in DIMACS:
-5864 -5865  5866  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 406}_2 ∧ -b^{2, 406}_1 ∧ -b^{2, 406}_0 ∧ true) 
c  in CNF:
c    -b^{2, 406}_2 ∨  b^{2, 406}_1 ∨  b^{2, 406}_0 ∨ false 
c  in DIMACS:
-5864  5865  5866  0

c  3 does not represent an automaton state.
c    -(-b^{2, 406}_2 ∧  b^{2, 406}_1 ∧  b^{2, 406}_0 ∧ true) 
c  in CNF:
c     b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ false 
c  in DIMACS:
 5864 -5865 -5866  0
c  -3 does not represent an automaton state.
c    -( b^{2, 406}_2 ∧  b^{2, 406}_1 ∧  b^{2, 406}_0 ∧ true) 
c  in CNF:
c    -b^{2, 406}_2 ∨ -b^{2, 406}_1 ∨ -b^{2, 406}_0 ∨ false 
c  in DIMACS:
-5864 -5865 -5866  0

c i = 407
c  -2+1 --> -1
c    ( b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧  p_814) -> ( b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0)
c  in CNF:
c    -b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨  b^{2, 408}_2
c    -b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_1
c    -b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨  b^{2, 408}_0
c  in DIMACS:
-5867 -5868  5869 -814  5870 0
-5867 -5868  5869 -814 -5871 0
-5867 -5868  5869 -814  5872 0

c  -1+1 --> 0
c    ( b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0 ∧  p_814) -> (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧ -b^{2, 408}_0)
c  in CNF:
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_2
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_1
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_0
c  in DIMACS:
-5867  5868 -5869 -814 -5870 0
-5867  5868 -5869 -814 -5871 0
-5867  5868 -5869 -814 -5872 0

c  0+1 --> 1
c    (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧  p_814) -> (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0)
c  in CNF:
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_2
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_1
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨  b^{2, 408}_0
c  in DIMACS:
 5867  5868  5869 -814 -5870 0
 5867  5868  5869 -814 -5871 0
 5867  5868  5869 -814  5872 0

c  1+1 --> 2
c    (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0 ∧  p_814) -> (-b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0)
c  in CNF:
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_2
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨  b^{2, 408}_1
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ -p_814 ∨ -b^{2, 408}_0
c  in DIMACS:
 5867  5868 -5869 -814 -5870 0
 5867  5868 -5869 -814  5871 0
 5867  5868 -5869 -814 -5872 0

c  2+1 --> break 
c    (-b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧  p_814) -> break
c  in CNF:
c     b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 5867 -5868  5869 -814 1162 0


c  2-1 --> 1
c    (-b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧ -p_814) -> (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0)
c  in CNF:
c     b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_2
c     b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_1
c     b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨  b^{2, 408}_0
c  in DIMACS:
 5867 -5868  5869  814 -5870 0
 5867 -5868  5869  814 -5871 0
 5867 -5868  5869  814  5872 0

c  1-1 --> 0
c    (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0 ∧ -p_814) -> (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧ -b^{2, 408}_0)
c  in CNF:
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_2
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_1
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_0
c  in DIMACS:
 5867  5868 -5869  814 -5870 0
 5867  5868 -5869  814 -5871 0
 5867  5868 -5869  814 -5872 0

c  0-1 --> -1
c    (-b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧ -p_814) -> ( b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0)
c  in CNF:
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨  b^{2, 408}_2
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_1
c     b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨  b^{2, 408}_0
c  in DIMACS:
 5867  5868  5869  814  5870 0
 5867  5868  5869  814 -5871 0
 5867  5868  5869  814  5872 0

c  -1-1 --> -2
c    ( b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧  b^{2, 407}_0 ∧ -p_814) -> ( b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0)
c  in CNF:
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨  b^{2, 408}_2
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨  b^{2, 408}_1
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨  p_814 ∨ -b^{2, 408}_0
c  in DIMACS:
-5867  5868 -5869  814  5870 0
-5867  5868 -5869  814  5871 0
-5867  5868 -5869  814 -5872 0

c  -2-1 --> break 
c    ( b^{2, 407}_2 ∧  b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨  b^{2, 407}_0 ∨  p_814 ∨ break
c  in DIMACS:
-5867 -5868  5869  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 407}_2 ∧ -b^{2, 407}_1 ∧ -b^{2, 407}_0 ∧ true) 
c  in CNF:
c    -b^{2, 407}_2 ∨  b^{2, 407}_1 ∨  b^{2, 407}_0 ∨ false 
c  in DIMACS:
-5867  5868  5869  0

c  3 does not represent an automaton state.
c    -(-b^{2, 407}_2 ∧  b^{2, 407}_1 ∧  b^{2, 407}_0 ∧ true) 
c  in CNF:
c     b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ false 
c  in DIMACS:
 5867 -5868 -5869  0
c  -3 does not represent an automaton state.
c    -( b^{2, 407}_2 ∧  b^{2, 407}_1 ∧  b^{2, 407}_0 ∧ true) 
c  in CNF:
c    -b^{2, 407}_2 ∨ -b^{2, 407}_1 ∨ -b^{2, 407}_0 ∨ false 
c  in DIMACS:
-5867 -5868 -5869  0

c i = 408
c  -2+1 --> -1
c    ( b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧  p_816) -> ( b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0)
c  in CNF:
c    -b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨  b^{2, 409}_2
c    -b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_1
c    -b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨  b^{2, 409}_0
c  in DIMACS:
-5870 -5871  5872 -816  5873 0
-5870 -5871  5872 -816 -5874 0
-5870 -5871  5872 -816  5875 0

c  -1+1 --> 0
c    ( b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0 ∧  p_816) -> (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧ -b^{2, 409}_0)
c  in CNF:
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_2
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_1
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_0
c  in DIMACS:
-5870  5871 -5872 -816 -5873 0
-5870  5871 -5872 -816 -5874 0
-5870  5871 -5872 -816 -5875 0

c  0+1 --> 1
c    (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧  p_816) -> (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0)
c  in CNF:
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_2
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_1
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨  b^{2, 409}_0
c  in DIMACS:
 5870  5871  5872 -816 -5873 0
 5870  5871  5872 -816 -5874 0
 5870  5871  5872 -816  5875 0

c  1+1 --> 2
c    (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0 ∧  p_816) -> (-b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0)
c  in CNF:
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_2
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨  b^{2, 409}_1
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ -p_816 ∨ -b^{2, 409}_0
c  in DIMACS:
 5870  5871 -5872 -816 -5873 0
 5870  5871 -5872 -816  5874 0
 5870  5871 -5872 -816 -5875 0

c  2+1 --> break 
c    (-b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧  p_816) -> break
c  in CNF:
c     b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 5870 -5871  5872 -816 1162 0


c  2-1 --> 1
c    (-b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧ -p_816) -> (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0)
c  in CNF:
c     b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_2
c     b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_1
c     b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨  b^{2, 409}_0
c  in DIMACS:
 5870 -5871  5872  816 -5873 0
 5870 -5871  5872  816 -5874 0
 5870 -5871  5872  816  5875 0

c  1-1 --> 0
c    (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0 ∧ -p_816) -> (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧ -b^{2, 409}_0)
c  in CNF:
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_2
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_1
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_0
c  in DIMACS:
 5870  5871 -5872  816 -5873 0
 5870  5871 -5872  816 -5874 0
 5870  5871 -5872  816 -5875 0

c  0-1 --> -1
c    (-b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧ -p_816) -> ( b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0)
c  in CNF:
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨  b^{2, 409}_2
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_1
c     b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨  b^{2, 409}_0
c  in DIMACS:
 5870  5871  5872  816  5873 0
 5870  5871  5872  816 -5874 0
 5870  5871  5872  816  5875 0

c  -1-1 --> -2
c    ( b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧  b^{2, 408}_0 ∧ -p_816) -> ( b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0)
c  in CNF:
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨  b^{2, 409}_2
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨  b^{2, 409}_1
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨  p_816 ∨ -b^{2, 409}_0
c  in DIMACS:
-5870  5871 -5872  816  5873 0
-5870  5871 -5872  816  5874 0
-5870  5871 -5872  816 -5875 0

c  -2-1 --> break 
c    ( b^{2, 408}_2 ∧  b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨  b^{2, 408}_0 ∨  p_816 ∨ break
c  in DIMACS:
-5870 -5871  5872  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 408}_2 ∧ -b^{2, 408}_1 ∧ -b^{2, 408}_0 ∧ true) 
c  in CNF:
c    -b^{2, 408}_2 ∨  b^{2, 408}_1 ∨  b^{2, 408}_0 ∨ false 
c  in DIMACS:
-5870  5871  5872  0

c  3 does not represent an automaton state.
c    -(-b^{2, 408}_2 ∧  b^{2, 408}_1 ∧  b^{2, 408}_0 ∧ true) 
c  in CNF:
c     b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ false 
c  in DIMACS:
 5870 -5871 -5872  0
c  -3 does not represent an automaton state.
c    -( b^{2, 408}_2 ∧  b^{2, 408}_1 ∧  b^{2, 408}_0 ∧ true) 
c  in CNF:
c    -b^{2, 408}_2 ∨ -b^{2, 408}_1 ∨ -b^{2, 408}_0 ∨ false 
c  in DIMACS:
-5870 -5871 -5872  0

c i = 409
c  -2+1 --> -1
c    ( b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧  p_818) -> ( b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0)
c  in CNF:
c    -b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨  b^{2, 410}_2
c    -b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_1
c    -b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨  b^{2, 410}_0
c  in DIMACS:
-5873 -5874  5875 -818  5876 0
-5873 -5874  5875 -818 -5877 0
-5873 -5874  5875 -818  5878 0

c  -1+1 --> 0
c    ( b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0 ∧  p_818) -> (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧ -b^{2, 410}_0)
c  in CNF:
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_2
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_1
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_0
c  in DIMACS:
-5873  5874 -5875 -818 -5876 0
-5873  5874 -5875 -818 -5877 0
-5873  5874 -5875 -818 -5878 0

c  0+1 --> 1
c    (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧  p_818) -> (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0)
c  in CNF:
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_2
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_1
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨  b^{2, 410}_0
c  in DIMACS:
 5873  5874  5875 -818 -5876 0
 5873  5874  5875 -818 -5877 0
 5873  5874  5875 -818  5878 0

c  1+1 --> 2
c    (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0 ∧  p_818) -> (-b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0)
c  in CNF:
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_2
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨  b^{2, 410}_1
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ -p_818 ∨ -b^{2, 410}_0
c  in DIMACS:
 5873  5874 -5875 -818 -5876 0
 5873  5874 -5875 -818  5877 0
 5873  5874 -5875 -818 -5878 0

c  2+1 --> break 
c    (-b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧  p_818) -> break
c  in CNF:
c     b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ -p_818 ∨ break
c  in DIMACS:
 5873 -5874  5875 -818 1162 0


c  2-1 --> 1
c    (-b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧ -p_818) -> (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0)
c  in CNF:
c     b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_2
c     b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_1
c     b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨  b^{2, 410}_0
c  in DIMACS:
 5873 -5874  5875  818 -5876 0
 5873 -5874  5875  818 -5877 0
 5873 -5874  5875  818  5878 0

c  1-1 --> 0
c    (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0 ∧ -p_818) -> (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧ -b^{2, 410}_0)
c  in CNF:
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_2
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_1
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_0
c  in DIMACS:
 5873  5874 -5875  818 -5876 0
 5873  5874 -5875  818 -5877 0
 5873  5874 -5875  818 -5878 0

c  0-1 --> -1
c    (-b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧ -p_818) -> ( b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0)
c  in CNF:
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨  b^{2, 410}_2
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_1
c     b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨  b^{2, 410}_0
c  in DIMACS:
 5873  5874  5875  818  5876 0
 5873  5874  5875  818 -5877 0
 5873  5874  5875  818  5878 0

c  -1-1 --> -2
c    ( b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧  b^{2, 409}_0 ∧ -p_818) -> ( b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0)
c  in CNF:
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨  b^{2, 410}_2
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨  b^{2, 410}_1
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨  p_818 ∨ -b^{2, 410}_0
c  in DIMACS:
-5873  5874 -5875  818  5876 0
-5873  5874 -5875  818  5877 0
-5873  5874 -5875  818 -5878 0

c  -2-1 --> break 
c    ( b^{2, 409}_2 ∧  b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧ -p_818) -> break
c  in CNF:
c    -b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨  b^{2, 409}_0 ∨  p_818 ∨ break
c  in DIMACS:
-5873 -5874  5875  818 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 409}_2 ∧ -b^{2, 409}_1 ∧ -b^{2, 409}_0 ∧ true) 
c  in CNF:
c    -b^{2, 409}_2 ∨  b^{2, 409}_1 ∨  b^{2, 409}_0 ∨ false 
c  in DIMACS:
-5873  5874  5875  0

c  3 does not represent an automaton state.
c    -(-b^{2, 409}_2 ∧  b^{2, 409}_1 ∧  b^{2, 409}_0 ∧ true) 
c  in CNF:
c     b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ false 
c  in DIMACS:
 5873 -5874 -5875  0
c  -3 does not represent an automaton state.
c    -( b^{2, 409}_2 ∧  b^{2, 409}_1 ∧  b^{2, 409}_0 ∧ true) 
c  in CNF:
c    -b^{2, 409}_2 ∨ -b^{2, 409}_1 ∨ -b^{2, 409}_0 ∨ false 
c  in DIMACS:
-5873 -5874 -5875  0

c i = 410
c  -2+1 --> -1
c    ( b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧  p_820) -> ( b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0)
c  in CNF:
c    -b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨  b^{2, 411}_2
c    -b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_1
c    -b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨  b^{2, 411}_0
c  in DIMACS:
-5876 -5877  5878 -820  5879 0
-5876 -5877  5878 -820 -5880 0
-5876 -5877  5878 -820  5881 0

c  -1+1 --> 0
c    ( b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0 ∧  p_820) -> (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧ -b^{2, 411}_0)
c  in CNF:
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_2
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_1
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_0
c  in DIMACS:
-5876  5877 -5878 -820 -5879 0
-5876  5877 -5878 -820 -5880 0
-5876  5877 -5878 -820 -5881 0

c  0+1 --> 1
c    (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧  p_820) -> (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0)
c  in CNF:
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_2
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_1
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨  b^{2, 411}_0
c  in DIMACS:
 5876  5877  5878 -820 -5879 0
 5876  5877  5878 -820 -5880 0
 5876  5877  5878 -820  5881 0

c  1+1 --> 2
c    (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0 ∧  p_820) -> (-b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0)
c  in CNF:
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_2
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨  b^{2, 411}_1
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ -p_820 ∨ -b^{2, 411}_0
c  in DIMACS:
 5876  5877 -5878 -820 -5879 0
 5876  5877 -5878 -820  5880 0
 5876  5877 -5878 -820 -5881 0

c  2+1 --> break 
c    (-b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧  p_820) -> break
c  in CNF:
c     b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 5876 -5877  5878 -820 1162 0


c  2-1 --> 1
c    (-b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧ -p_820) -> (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0)
c  in CNF:
c     b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_2
c     b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_1
c     b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨  b^{2, 411}_0
c  in DIMACS:
 5876 -5877  5878  820 -5879 0
 5876 -5877  5878  820 -5880 0
 5876 -5877  5878  820  5881 0

c  1-1 --> 0
c    (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0 ∧ -p_820) -> (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧ -b^{2, 411}_0)
c  in CNF:
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_2
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_1
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_0
c  in DIMACS:
 5876  5877 -5878  820 -5879 0
 5876  5877 -5878  820 -5880 0
 5876  5877 -5878  820 -5881 0

c  0-1 --> -1
c    (-b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧ -p_820) -> ( b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0)
c  in CNF:
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨  b^{2, 411}_2
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_1
c     b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨  b^{2, 411}_0
c  in DIMACS:
 5876  5877  5878  820  5879 0
 5876  5877  5878  820 -5880 0
 5876  5877  5878  820  5881 0

c  -1-1 --> -2
c    ( b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧  b^{2, 410}_0 ∧ -p_820) -> ( b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0)
c  in CNF:
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨  b^{2, 411}_2
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨  b^{2, 411}_1
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨  p_820 ∨ -b^{2, 411}_0
c  in DIMACS:
-5876  5877 -5878  820  5879 0
-5876  5877 -5878  820  5880 0
-5876  5877 -5878  820 -5881 0

c  -2-1 --> break 
c    ( b^{2, 410}_2 ∧  b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨  b^{2, 410}_0 ∨  p_820 ∨ break
c  in DIMACS:
-5876 -5877  5878  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 410}_2 ∧ -b^{2, 410}_1 ∧ -b^{2, 410}_0 ∧ true) 
c  in CNF:
c    -b^{2, 410}_2 ∨  b^{2, 410}_1 ∨  b^{2, 410}_0 ∨ false 
c  in DIMACS:
-5876  5877  5878  0

c  3 does not represent an automaton state.
c    -(-b^{2, 410}_2 ∧  b^{2, 410}_1 ∧  b^{2, 410}_0 ∧ true) 
c  in CNF:
c     b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ false 
c  in DIMACS:
 5876 -5877 -5878  0
c  -3 does not represent an automaton state.
c    -( b^{2, 410}_2 ∧  b^{2, 410}_1 ∧  b^{2, 410}_0 ∧ true) 
c  in CNF:
c    -b^{2, 410}_2 ∨ -b^{2, 410}_1 ∨ -b^{2, 410}_0 ∨ false 
c  in DIMACS:
-5876 -5877 -5878  0

c i = 411
c  -2+1 --> -1
c    ( b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧  p_822) -> ( b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0)
c  in CNF:
c    -b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨  b^{2, 412}_2
c    -b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_1
c    -b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨  b^{2, 412}_0
c  in DIMACS:
-5879 -5880  5881 -822  5882 0
-5879 -5880  5881 -822 -5883 0
-5879 -5880  5881 -822  5884 0

c  -1+1 --> 0
c    ( b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0 ∧  p_822) -> (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧ -b^{2, 412}_0)
c  in CNF:
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_2
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_1
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_0
c  in DIMACS:
-5879  5880 -5881 -822 -5882 0
-5879  5880 -5881 -822 -5883 0
-5879  5880 -5881 -822 -5884 0

c  0+1 --> 1
c    (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧  p_822) -> (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0)
c  in CNF:
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_2
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_1
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨  b^{2, 412}_0
c  in DIMACS:
 5879  5880  5881 -822 -5882 0
 5879  5880  5881 -822 -5883 0
 5879  5880  5881 -822  5884 0

c  1+1 --> 2
c    (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0 ∧  p_822) -> (-b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0)
c  in CNF:
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_2
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨  b^{2, 412}_1
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ -p_822 ∨ -b^{2, 412}_0
c  in DIMACS:
 5879  5880 -5881 -822 -5882 0
 5879  5880 -5881 -822  5883 0
 5879  5880 -5881 -822 -5884 0

c  2+1 --> break 
c    (-b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧  p_822) -> break
c  in CNF:
c     b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 5879 -5880  5881 -822 1162 0


c  2-1 --> 1
c    (-b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧ -p_822) -> (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0)
c  in CNF:
c     b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_2
c     b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_1
c     b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨  b^{2, 412}_0
c  in DIMACS:
 5879 -5880  5881  822 -5882 0
 5879 -5880  5881  822 -5883 0
 5879 -5880  5881  822  5884 0

c  1-1 --> 0
c    (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0 ∧ -p_822) -> (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧ -b^{2, 412}_0)
c  in CNF:
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_2
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_1
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_0
c  in DIMACS:
 5879  5880 -5881  822 -5882 0
 5879  5880 -5881  822 -5883 0
 5879  5880 -5881  822 -5884 0

c  0-1 --> -1
c    (-b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧ -p_822) -> ( b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0)
c  in CNF:
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨  b^{2, 412}_2
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_1
c     b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨  b^{2, 412}_0
c  in DIMACS:
 5879  5880  5881  822  5882 0
 5879  5880  5881  822 -5883 0
 5879  5880  5881  822  5884 0

c  -1-1 --> -2
c    ( b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧  b^{2, 411}_0 ∧ -p_822) -> ( b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0)
c  in CNF:
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨  b^{2, 412}_2
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨  b^{2, 412}_1
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨  p_822 ∨ -b^{2, 412}_0
c  in DIMACS:
-5879  5880 -5881  822  5882 0
-5879  5880 -5881  822  5883 0
-5879  5880 -5881  822 -5884 0

c  -2-1 --> break 
c    ( b^{2, 411}_2 ∧  b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨  b^{2, 411}_0 ∨  p_822 ∨ break
c  in DIMACS:
-5879 -5880  5881  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 411}_2 ∧ -b^{2, 411}_1 ∧ -b^{2, 411}_0 ∧ true) 
c  in CNF:
c    -b^{2, 411}_2 ∨  b^{2, 411}_1 ∨  b^{2, 411}_0 ∨ false 
c  in DIMACS:
-5879  5880  5881  0

c  3 does not represent an automaton state.
c    -(-b^{2, 411}_2 ∧  b^{2, 411}_1 ∧  b^{2, 411}_0 ∧ true) 
c  in CNF:
c     b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ false 
c  in DIMACS:
 5879 -5880 -5881  0
c  -3 does not represent an automaton state.
c    -( b^{2, 411}_2 ∧  b^{2, 411}_1 ∧  b^{2, 411}_0 ∧ true) 
c  in CNF:
c    -b^{2, 411}_2 ∨ -b^{2, 411}_1 ∨ -b^{2, 411}_0 ∨ false 
c  in DIMACS:
-5879 -5880 -5881  0

c i = 412
c  -2+1 --> -1
c    ( b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧  p_824) -> ( b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0)
c  in CNF:
c    -b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨  b^{2, 413}_2
c    -b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_1
c    -b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨  b^{2, 413}_0
c  in DIMACS:
-5882 -5883  5884 -824  5885 0
-5882 -5883  5884 -824 -5886 0
-5882 -5883  5884 -824  5887 0

c  -1+1 --> 0
c    ( b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0 ∧  p_824) -> (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧ -b^{2, 413}_0)
c  in CNF:
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_2
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_1
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_0
c  in DIMACS:
-5882  5883 -5884 -824 -5885 0
-5882  5883 -5884 -824 -5886 0
-5882  5883 -5884 -824 -5887 0

c  0+1 --> 1
c    (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧  p_824) -> (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0)
c  in CNF:
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_2
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_1
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨  b^{2, 413}_0
c  in DIMACS:
 5882  5883  5884 -824 -5885 0
 5882  5883  5884 -824 -5886 0
 5882  5883  5884 -824  5887 0

c  1+1 --> 2
c    (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0 ∧  p_824) -> (-b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0)
c  in CNF:
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_2
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨  b^{2, 413}_1
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ -p_824 ∨ -b^{2, 413}_0
c  in DIMACS:
 5882  5883 -5884 -824 -5885 0
 5882  5883 -5884 -824  5886 0
 5882  5883 -5884 -824 -5887 0

c  2+1 --> break 
c    (-b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧  p_824) -> break
c  in CNF:
c     b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 5882 -5883  5884 -824 1162 0


c  2-1 --> 1
c    (-b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧ -p_824) -> (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0)
c  in CNF:
c     b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_2
c     b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_1
c     b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨  b^{2, 413}_0
c  in DIMACS:
 5882 -5883  5884  824 -5885 0
 5882 -5883  5884  824 -5886 0
 5882 -5883  5884  824  5887 0

c  1-1 --> 0
c    (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0 ∧ -p_824) -> (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧ -b^{2, 413}_0)
c  in CNF:
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_2
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_1
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_0
c  in DIMACS:
 5882  5883 -5884  824 -5885 0
 5882  5883 -5884  824 -5886 0
 5882  5883 -5884  824 -5887 0

c  0-1 --> -1
c    (-b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧ -p_824) -> ( b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0)
c  in CNF:
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨  b^{2, 413}_2
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_1
c     b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨  b^{2, 413}_0
c  in DIMACS:
 5882  5883  5884  824  5885 0
 5882  5883  5884  824 -5886 0
 5882  5883  5884  824  5887 0

c  -1-1 --> -2
c    ( b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧  b^{2, 412}_0 ∧ -p_824) -> ( b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0)
c  in CNF:
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨  b^{2, 413}_2
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨  b^{2, 413}_1
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨  p_824 ∨ -b^{2, 413}_0
c  in DIMACS:
-5882  5883 -5884  824  5885 0
-5882  5883 -5884  824  5886 0
-5882  5883 -5884  824 -5887 0

c  -2-1 --> break 
c    ( b^{2, 412}_2 ∧  b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨  b^{2, 412}_0 ∨  p_824 ∨ break
c  in DIMACS:
-5882 -5883  5884  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 412}_2 ∧ -b^{2, 412}_1 ∧ -b^{2, 412}_0 ∧ true) 
c  in CNF:
c    -b^{2, 412}_2 ∨  b^{2, 412}_1 ∨  b^{2, 412}_0 ∨ false 
c  in DIMACS:
-5882  5883  5884  0

c  3 does not represent an automaton state.
c    -(-b^{2, 412}_2 ∧  b^{2, 412}_1 ∧  b^{2, 412}_0 ∧ true) 
c  in CNF:
c     b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ false 
c  in DIMACS:
 5882 -5883 -5884  0
c  -3 does not represent an automaton state.
c    -( b^{2, 412}_2 ∧  b^{2, 412}_1 ∧  b^{2, 412}_0 ∧ true) 
c  in CNF:
c    -b^{2, 412}_2 ∨ -b^{2, 412}_1 ∨ -b^{2, 412}_0 ∨ false 
c  in DIMACS:
-5882 -5883 -5884  0

c i = 413
c  -2+1 --> -1
c    ( b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧  p_826) -> ( b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0)
c  in CNF:
c    -b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨  b^{2, 414}_2
c    -b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_1
c    -b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨  b^{2, 414}_0
c  in DIMACS:
-5885 -5886  5887 -826  5888 0
-5885 -5886  5887 -826 -5889 0
-5885 -5886  5887 -826  5890 0

c  -1+1 --> 0
c    ( b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0 ∧  p_826) -> (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧ -b^{2, 414}_0)
c  in CNF:
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_2
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_1
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_0
c  in DIMACS:
-5885  5886 -5887 -826 -5888 0
-5885  5886 -5887 -826 -5889 0
-5885  5886 -5887 -826 -5890 0

c  0+1 --> 1
c    (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧  p_826) -> (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0)
c  in CNF:
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_2
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_1
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨  b^{2, 414}_0
c  in DIMACS:
 5885  5886  5887 -826 -5888 0
 5885  5886  5887 -826 -5889 0
 5885  5886  5887 -826  5890 0

c  1+1 --> 2
c    (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0 ∧  p_826) -> (-b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0)
c  in CNF:
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_2
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨  b^{2, 414}_1
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ -p_826 ∨ -b^{2, 414}_0
c  in DIMACS:
 5885  5886 -5887 -826 -5888 0
 5885  5886 -5887 -826  5889 0
 5885  5886 -5887 -826 -5890 0

c  2+1 --> break 
c    (-b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧  p_826) -> break
c  in CNF:
c     b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 5885 -5886  5887 -826 1162 0


c  2-1 --> 1
c    (-b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧ -p_826) -> (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0)
c  in CNF:
c     b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_2
c     b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_1
c     b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨  b^{2, 414}_0
c  in DIMACS:
 5885 -5886  5887  826 -5888 0
 5885 -5886  5887  826 -5889 0
 5885 -5886  5887  826  5890 0

c  1-1 --> 0
c    (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0 ∧ -p_826) -> (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧ -b^{2, 414}_0)
c  in CNF:
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_2
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_1
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_0
c  in DIMACS:
 5885  5886 -5887  826 -5888 0
 5885  5886 -5887  826 -5889 0
 5885  5886 -5887  826 -5890 0

c  0-1 --> -1
c    (-b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧ -p_826) -> ( b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0)
c  in CNF:
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨  b^{2, 414}_2
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_1
c     b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨  b^{2, 414}_0
c  in DIMACS:
 5885  5886  5887  826  5888 0
 5885  5886  5887  826 -5889 0
 5885  5886  5887  826  5890 0

c  -1-1 --> -2
c    ( b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧  b^{2, 413}_0 ∧ -p_826) -> ( b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0)
c  in CNF:
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨  b^{2, 414}_2
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨  b^{2, 414}_1
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨  p_826 ∨ -b^{2, 414}_0
c  in DIMACS:
-5885  5886 -5887  826  5888 0
-5885  5886 -5887  826  5889 0
-5885  5886 -5887  826 -5890 0

c  -2-1 --> break 
c    ( b^{2, 413}_2 ∧  b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨  b^{2, 413}_0 ∨  p_826 ∨ break
c  in DIMACS:
-5885 -5886  5887  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 413}_2 ∧ -b^{2, 413}_1 ∧ -b^{2, 413}_0 ∧ true) 
c  in CNF:
c    -b^{2, 413}_2 ∨  b^{2, 413}_1 ∨  b^{2, 413}_0 ∨ false 
c  in DIMACS:
-5885  5886  5887  0

c  3 does not represent an automaton state.
c    -(-b^{2, 413}_2 ∧  b^{2, 413}_1 ∧  b^{2, 413}_0 ∧ true) 
c  in CNF:
c     b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ false 
c  in DIMACS:
 5885 -5886 -5887  0
c  -3 does not represent an automaton state.
c    -( b^{2, 413}_2 ∧  b^{2, 413}_1 ∧  b^{2, 413}_0 ∧ true) 
c  in CNF:
c    -b^{2, 413}_2 ∨ -b^{2, 413}_1 ∨ -b^{2, 413}_0 ∨ false 
c  in DIMACS:
-5885 -5886 -5887  0

c i = 414
c  -2+1 --> -1
c    ( b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧  p_828) -> ( b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0)
c  in CNF:
c    -b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨  b^{2, 415}_2
c    -b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_1
c    -b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨  b^{2, 415}_0
c  in DIMACS:
-5888 -5889  5890 -828  5891 0
-5888 -5889  5890 -828 -5892 0
-5888 -5889  5890 -828  5893 0

c  -1+1 --> 0
c    ( b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0 ∧  p_828) -> (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧ -b^{2, 415}_0)
c  in CNF:
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_2
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_1
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_0
c  in DIMACS:
-5888  5889 -5890 -828 -5891 0
-5888  5889 -5890 -828 -5892 0
-5888  5889 -5890 -828 -5893 0

c  0+1 --> 1
c    (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧  p_828) -> (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0)
c  in CNF:
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_2
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_1
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨  b^{2, 415}_0
c  in DIMACS:
 5888  5889  5890 -828 -5891 0
 5888  5889  5890 -828 -5892 0
 5888  5889  5890 -828  5893 0

c  1+1 --> 2
c    (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0 ∧  p_828) -> (-b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0)
c  in CNF:
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_2
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨  b^{2, 415}_1
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ -p_828 ∨ -b^{2, 415}_0
c  in DIMACS:
 5888  5889 -5890 -828 -5891 0
 5888  5889 -5890 -828  5892 0
 5888  5889 -5890 -828 -5893 0

c  2+1 --> break 
c    (-b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧  p_828) -> break
c  in CNF:
c     b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 5888 -5889  5890 -828 1162 0


c  2-1 --> 1
c    (-b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧ -p_828) -> (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0)
c  in CNF:
c     b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_2
c     b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_1
c     b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨  b^{2, 415}_0
c  in DIMACS:
 5888 -5889  5890  828 -5891 0
 5888 -5889  5890  828 -5892 0
 5888 -5889  5890  828  5893 0

c  1-1 --> 0
c    (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0 ∧ -p_828) -> (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧ -b^{2, 415}_0)
c  in CNF:
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_2
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_1
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_0
c  in DIMACS:
 5888  5889 -5890  828 -5891 0
 5888  5889 -5890  828 -5892 0
 5888  5889 -5890  828 -5893 0

c  0-1 --> -1
c    (-b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧ -p_828) -> ( b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0)
c  in CNF:
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨  b^{2, 415}_2
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_1
c     b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨  b^{2, 415}_0
c  in DIMACS:
 5888  5889  5890  828  5891 0
 5888  5889  5890  828 -5892 0
 5888  5889  5890  828  5893 0

c  -1-1 --> -2
c    ( b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧  b^{2, 414}_0 ∧ -p_828) -> ( b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0)
c  in CNF:
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨  b^{2, 415}_2
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨  b^{2, 415}_1
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨  p_828 ∨ -b^{2, 415}_0
c  in DIMACS:
-5888  5889 -5890  828  5891 0
-5888  5889 -5890  828  5892 0
-5888  5889 -5890  828 -5893 0

c  -2-1 --> break 
c    ( b^{2, 414}_2 ∧  b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨  b^{2, 414}_0 ∨  p_828 ∨ break
c  in DIMACS:
-5888 -5889  5890  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 414}_2 ∧ -b^{2, 414}_1 ∧ -b^{2, 414}_0 ∧ true) 
c  in CNF:
c    -b^{2, 414}_2 ∨  b^{2, 414}_1 ∨  b^{2, 414}_0 ∨ false 
c  in DIMACS:
-5888  5889  5890  0

c  3 does not represent an automaton state.
c    -(-b^{2, 414}_2 ∧  b^{2, 414}_1 ∧  b^{2, 414}_0 ∧ true) 
c  in CNF:
c     b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ false 
c  in DIMACS:
 5888 -5889 -5890  0
c  -3 does not represent an automaton state.
c    -( b^{2, 414}_2 ∧  b^{2, 414}_1 ∧  b^{2, 414}_0 ∧ true) 
c  in CNF:
c    -b^{2, 414}_2 ∨ -b^{2, 414}_1 ∨ -b^{2, 414}_0 ∨ false 
c  in DIMACS:
-5888 -5889 -5890  0

c i = 415
c  -2+1 --> -1
c    ( b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧  p_830) -> ( b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0)
c  in CNF:
c    -b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨  b^{2, 416}_2
c    -b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_1
c    -b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨  b^{2, 416}_0
c  in DIMACS:
-5891 -5892  5893 -830  5894 0
-5891 -5892  5893 -830 -5895 0
-5891 -5892  5893 -830  5896 0

c  -1+1 --> 0
c    ( b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0 ∧  p_830) -> (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧ -b^{2, 416}_0)
c  in CNF:
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_2
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_1
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_0
c  in DIMACS:
-5891  5892 -5893 -830 -5894 0
-5891  5892 -5893 -830 -5895 0
-5891  5892 -5893 -830 -5896 0

c  0+1 --> 1
c    (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧  p_830) -> (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0)
c  in CNF:
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_2
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_1
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨  b^{2, 416}_0
c  in DIMACS:
 5891  5892  5893 -830 -5894 0
 5891  5892  5893 -830 -5895 0
 5891  5892  5893 -830  5896 0

c  1+1 --> 2
c    (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0 ∧  p_830) -> (-b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0)
c  in CNF:
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_2
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨  b^{2, 416}_1
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ -p_830 ∨ -b^{2, 416}_0
c  in DIMACS:
 5891  5892 -5893 -830 -5894 0
 5891  5892 -5893 -830  5895 0
 5891  5892 -5893 -830 -5896 0

c  2+1 --> break 
c    (-b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧  p_830) -> break
c  in CNF:
c     b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 5891 -5892  5893 -830 1162 0


c  2-1 --> 1
c    (-b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧ -p_830) -> (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0)
c  in CNF:
c     b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_2
c     b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_1
c     b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨  b^{2, 416}_0
c  in DIMACS:
 5891 -5892  5893  830 -5894 0
 5891 -5892  5893  830 -5895 0
 5891 -5892  5893  830  5896 0

c  1-1 --> 0
c    (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0 ∧ -p_830) -> (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧ -b^{2, 416}_0)
c  in CNF:
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_2
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_1
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_0
c  in DIMACS:
 5891  5892 -5893  830 -5894 0
 5891  5892 -5893  830 -5895 0
 5891  5892 -5893  830 -5896 0

c  0-1 --> -1
c    (-b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧ -p_830) -> ( b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0)
c  in CNF:
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨  b^{2, 416}_2
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_1
c     b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨  b^{2, 416}_0
c  in DIMACS:
 5891  5892  5893  830  5894 0
 5891  5892  5893  830 -5895 0
 5891  5892  5893  830  5896 0

c  -1-1 --> -2
c    ( b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧  b^{2, 415}_0 ∧ -p_830) -> ( b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0)
c  in CNF:
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨  b^{2, 416}_2
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨  b^{2, 416}_1
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨  p_830 ∨ -b^{2, 416}_0
c  in DIMACS:
-5891  5892 -5893  830  5894 0
-5891  5892 -5893  830  5895 0
-5891  5892 -5893  830 -5896 0

c  -2-1 --> break 
c    ( b^{2, 415}_2 ∧  b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨  b^{2, 415}_0 ∨  p_830 ∨ break
c  in DIMACS:
-5891 -5892  5893  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 415}_2 ∧ -b^{2, 415}_1 ∧ -b^{2, 415}_0 ∧ true) 
c  in CNF:
c    -b^{2, 415}_2 ∨  b^{2, 415}_1 ∨  b^{2, 415}_0 ∨ false 
c  in DIMACS:
-5891  5892  5893  0

c  3 does not represent an automaton state.
c    -(-b^{2, 415}_2 ∧  b^{2, 415}_1 ∧  b^{2, 415}_0 ∧ true) 
c  in CNF:
c     b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ false 
c  in DIMACS:
 5891 -5892 -5893  0
c  -3 does not represent an automaton state.
c    -( b^{2, 415}_2 ∧  b^{2, 415}_1 ∧  b^{2, 415}_0 ∧ true) 
c  in CNF:
c    -b^{2, 415}_2 ∨ -b^{2, 415}_1 ∨ -b^{2, 415}_0 ∨ false 
c  in DIMACS:
-5891 -5892 -5893  0

c i = 416
c  -2+1 --> -1
c    ( b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧  p_832) -> ( b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0)
c  in CNF:
c    -b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨  b^{2, 417}_2
c    -b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_1
c    -b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨  b^{2, 417}_0
c  in DIMACS:
-5894 -5895  5896 -832  5897 0
-5894 -5895  5896 -832 -5898 0
-5894 -5895  5896 -832  5899 0

c  -1+1 --> 0
c    ( b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0 ∧  p_832) -> (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧ -b^{2, 417}_0)
c  in CNF:
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_2
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_1
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_0
c  in DIMACS:
-5894  5895 -5896 -832 -5897 0
-5894  5895 -5896 -832 -5898 0
-5894  5895 -5896 -832 -5899 0

c  0+1 --> 1
c    (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧  p_832) -> (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0)
c  in CNF:
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_2
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_1
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨  b^{2, 417}_0
c  in DIMACS:
 5894  5895  5896 -832 -5897 0
 5894  5895  5896 -832 -5898 0
 5894  5895  5896 -832  5899 0

c  1+1 --> 2
c    (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0 ∧  p_832) -> (-b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0)
c  in CNF:
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_2
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨  b^{2, 417}_1
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ -p_832 ∨ -b^{2, 417}_0
c  in DIMACS:
 5894  5895 -5896 -832 -5897 0
 5894  5895 -5896 -832  5898 0
 5894  5895 -5896 -832 -5899 0

c  2+1 --> break 
c    (-b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧  p_832) -> break
c  in CNF:
c     b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 5894 -5895  5896 -832 1162 0


c  2-1 --> 1
c    (-b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧ -p_832) -> (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0)
c  in CNF:
c     b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_2
c     b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_1
c     b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨  b^{2, 417}_0
c  in DIMACS:
 5894 -5895  5896  832 -5897 0
 5894 -5895  5896  832 -5898 0
 5894 -5895  5896  832  5899 0

c  1-1 --> 0
c    (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0 ∧ -p_832) -> (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧ -b^{2, 417}_0)
c  in CNF:
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_2
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_1
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_0
c  in DIMACS:
 5894  5895 -5896  832 -5897 0
 5894  5895 -5896  832 -5898 0
 5894  5895 -5896  832 -5899 0

c  0-1 --> -1
c    (-b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧ -p_832) -> ( b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0)
c  in CNF:
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨  b^{2, 417}_2
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_1
c     b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨  b^{2, 417}_0
c  in DIMACS:
 5894  5895  5896  832  5897 0
 5894  5895  5896  832 -5898 0
 5894  5895  5896  832  5899 0

c  -1-1 --> -2
c    ( b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧  b^{2, 416}_0 ∧ -p_832) -> ( b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0)
c  in CNF:
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨  b^{2, 417}_2
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨  b^{2, 417}_1
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨  p_832 ∨ -b^{2, 417}_0
c  in DIMACS:
-5894  5895 -5896  832  5897 0
-5894  5895 -5896  832  5898 0
-5894  5895 -5896  832 -5899 0

c  -2-1 --> break 
c    ( b^{2, 416}_2 ∧  b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨  b^{2, 416}_0 ∨  p_832 ∨ break
c  in DIMACS:
-5894 -5895  5896  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 416}_2 ∧ -b^{2, 416}_1 ∧ -b^{2, 416}_0 ∧ true) 
c  in CNF:
c    -b^{2, 416}_2 ∨  b^{2, 416}_1 ∨  b^{2, 416}_0 ∨ false 
c  in DIMACS:
-5894  5895  5896  0

c  3 does not represent an automaton state.
c    -(-b^{2, 416}_2 ∧  b^{2, 416}_1 ∧  b^{2, 416}_0 ∧ true) 
c  in CNF:
c     b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ false 
c  in DIMACS:
 5894 -5895 -5896  0
c  -3 does not represent an automaton state.
c    -( b^{2, 416}_2 ∧  b^{2, 416}_1 ∧  b^{2, 416}_0 ∧ true) 
c  in CNF:
c    -b^{2, 416}_2 ∨ -b^{2, 416}_1 ∨ -b^{2, 416}_0 ∨ false 
c  in DIMACS:
-5894 -5895 -5896  0

c i = 417
c  -2+1 --> -1
c    ( b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧  p_834) -> ( b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0)
c  in CNF:
c    -b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨  b^{2, 418}_2
c    -b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_1
c    -b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨  b^{2, 418}_0
c  in DIMACS:
-5897 -5898  5899 -834  5900 0
-5897 -5898  5899 -834 -5901 0
-5897 -5898  5899 -834  5902 0

c  -1+1 --> 0
c    ( b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0 ∧  p_834) -> (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧ -b^{2, 418}_0)
c  in CNF:
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_2
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_1
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_0
c  in DIMACS:
-5897  5898 -5899 -834 -5900 0
-5897  5898 -5899 -834 -5901 0
-5897  5898 -5899 -834 -5902 0

c  0+1 --> 1
c    (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧  p_834) -> (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0)
c  in CNF:
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_2
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_1
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨  b^{2, 418}_0
c  in DIMACS:
 5897  5898  5899 -834 -5900 0
 5897  5898  5899 -834 -5901 0
 5897  5898  5899 -834  5902 0

c  1+1 --> 2
c    (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0 ∧  p_834) -> (-b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0)
c  in CNF:
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_2
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨  b^{2, 418}_1
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ -p_834 ∨ -b^{2, 418}_0
c  in DIMACS:
 5897  5898 -5899 -834 -5900 0
 5897  5898 -5899 -834  5901 0
 5897  5898 -5899 -834 -5902 0

c  2+1 --> break 
c    (-b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧  p_834) -> break
c  in CNF:
c     b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 5897 -5898  5899 -834 1162 0


c  2-1 --> 1
c    (-b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧ -p_834) -> (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0)
c  in CNF:
c     b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_2
c     b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_1
c     b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨  b^{2, 418}_0
c  in DIMACS:
 5897 -5898  5899  834 -5900 0
 5897 -5898  5899  834 -5901 0
 5897 -5898  5899  834  5902 0

c  1-1 --> 0
c    (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0 ∧ -p_834) -> (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧ -b^{2, 418}_0)
c  in CNF:
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_2
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_1
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_0
c  in DIMACS:
 5897  5898 -5899  834 -5900 0
 5897  5898 -5899  834 -5901 0
 5897  5898 -5899  834 -5902 0

c  0-1 --> -1
c    (-b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧ -p_834) -> ( b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0)
c  in CNF:
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨  b^{2, 418}_2
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_1
c     b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨  b^{2, 418}_0
c  in DIMACS:
 5897  5898  5899  834  5900 0
 5897  5898  5899  834 -5901 0
 5897  5898  5899  834  5902 0

c  -1-1 --> -2
c    ( b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧  b^{2, 417}_0 ∧ -p_834) -> ( b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0)
c  in CNF:
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨  b^{2, 418}_2
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨  b^{2, 418}_1
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨  p_834 ∨ -b^{2, 418}_0
c  in DIMACS:
-5897  5898 -5899  834  5900 0
-5897  5898 -5899  834  5901 0
-5897  5898 -5899  834 -5902 0

c  -2-1 --> break 
c    ( b^{2, 417}_2 ∧  b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨  b^{2, 417}_0 ∨  p_834 ∨ break
c  in DIMACS:
-5897 -5898  5899  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 417}_2 ∧ -b^{2, 417}_1 ∧ -b^{2, 417}_0 ∧ true) 
c  in CNF:
c    -b^{2, 417}_2 ∨  b^{2, 417}_1 ∨  b^{2, 417}_0 ∨ false 
c  in DIMACS:
-5897  5898  5899  0

c  3 does not represent an automaton state.
c    -(-b^{2, 417}_2 ∧  b^{2, 417}_1 ∧  b^{2, 417}_0 ∧ true) 
c  in CNF:
c     b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ false 
c  in DIMACS:
 5897 -5898 -5899  0
c  -3 does not represent an automaton state.
c    -( b^{2, 417}_2 ∧  b^{2, 417}_1 ∧  b^{2, 417}_0 ∧ true) 
c  in CNF:
c    -b^{2, 417}_2 ∨ -b^{2, 417}_1 ∨ -b^{2, 417}_0 ∨ false 
c  in DIMACS:
-5897 -5898 -5899  0

c i = 418
c  -2+1 --> -1
c    ( b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧  p_836) -> ( b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0)
c  in CNF:
c    -b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨  b^{2, 419}_2
c    -b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_1
c    -b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨  b^{2, 419}_0
c  in DIMACS:
-5900 -5901  5902 -836  5903 0
-5900 -5901  5902 -836 -5904 0
-5900 -5901  5902 -836  5905 0

c  -1+1 --> 0
c    ( b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0 ∧  p_836) -> (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧ -b^{2, 419}_0)
c  in CNF:
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_2
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_1
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_0
c  in DIMACS:
-5900  5901 -5902 -836 -5903 0
-5900  5901 -5902 -836 -5904 0
-5900  5901 -5902 -836 -5905 0

c  0+1 --> 1
c    (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧  p_836) -> (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0)
c  in CNF:
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_2
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_1
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨  b^{2, 419}_0
c  in DIMACS:
 5900  5901  5902 -836 -5903 0
 5900  5901  5902 -836 -5904 0
 5900  5901  5902 -836  5905 0

c  1+1 --> 2
c    (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0 ∧  p_836) -> (-b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0)
c  in CNF:
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_2
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨  b^{2, 419}_1
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ -p_836 ∨ -b^{2, 419}_0
c  in DIMACS:
 5900  5901 -5902 -836 -5903 0
 5900  5901 -5902 -836  5904 0
 5900  5901 -5902 -836 -5905 0

c  2+1 --> break 
c    (-b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧  p_836) -> break
c  in CNF:
c     b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 5900 -5901  5902 -836 1162 0


c  2-1 --> 1
c    (-b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧ -p_836) -> (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0)
c  in CNF:
c     b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_2
c     b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_1
c     b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨  b^{2, 419}_0
c  in DIMACS:
 5900 -5901  5902  836 -5903 0
 5900 -5901  5902  836 -5904 0
 5900 -5901  5902  836  5905 0

c  1-1 --> 0
c    (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0 ∧ -p_836) -> (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧ -b^{2, 419}_0)
c  in CNF:
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_2
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_1
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_0
c  in DIMACS:
 5900  5901 -5902  836 -5903 0
 5900  5901 -5902  836 -5904 0
 5900  5901 -5902  836 -5905 0

c  0-1 --> -1
c    (-b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧ -p_836) -> ( b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0)
c  in CNF:
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨  b^{2, 419}_2
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_1
c     b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨  b^{2, 419}_0
c  in DIMACS:
 5900  5901  5902  836  5903 0
 5900  5901  5902  836 -5904 0
 5900  5901  5902  836  5905 0

c  -1-1 --> -2
c    ( b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧  b^{2, 418}_0 ∧ -p_836) -> ( b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0)
c  in CNF:
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨  b^{2, 419}_2
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨  b^{2, 419}_1
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨  p_836 ∨ -b^{2, 419}_0
c  in DIMACS:
-5900  5901 -5902  836  5903 0
-5900  5901 -5902  836  5904 0
-5900  5901 -5902  836 -5905 0

c  -2-1 --> break 
c    ( b^{2, 418}_2 ∧  b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨  b^{2, 418}_0 ∨  p_836 ∨ break
c  in DIMACS:
-5900 -5901  5902  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 418}_2 ∧ -b^{2, 418}_1 ∧ -b^{2, 418}_0 ∧ true) 
c  in CNF:
c    -b^{2, 418}_2 ∨  b^{2, 418}_1 ∨  b^{2, 418}_0 ∨ false 
c  in DIMACS:
-5900  5901  5902  0

c  3 does not represent an automaton state.
c    -(-b^{2, 418}_2 ∧  b^{2, 418}_1 ∧  b^{2, 418}_0 ∧ true) 
c  in CNF:
c     b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ false 
c  in DIMACS:
 5900 -5901 -5902  0
c  -3 does not represent an automaton state.
c    -( b^{2, 418}_2 ∧  b^{2, 418}_1 ∧  b^{2, 418}_0 ∧ true) 
c  in CNF:
c    -b^{2, 418}_2 ∨ -b^{2, 418}_1 ∨ -b^{2, 418}_0 ∨ false 
c  in DIMACS:
-5900 -5901 -5902  0

c i = 419
c  -2+1 --> -1
c    ( b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧  p_838) -> ( b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0)
c  in CNF:
c    -b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨  b^{2, 420}_2
c    -b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_1
c    -b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨  b^{2, 420}_0
c  in DIMACS:
-5903 -5904  5905 -838  5906 0
-5903 -5904  5905 -838 -5907 0
-5903 -5904  5905 -838  5908 0

c  -1+1 --> 0
c    ( b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0 ∧  p_838) -> (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧ -b^{2, 420}_0)
c  in CNF:
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_2
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_1
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_0
c  in DIMACS:
-5903  5904 -5905 -838 -5906 0
-5903  5904 -5905 -838 -5907 0
-5903  5904 -5905 -838 -5908 0

c  0+1 --> 1
c    (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧  p_838) -> (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0)
c  in CNF:
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_2
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_1
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨  b^{2, 420}_0
c  in DIMACS:
 5903  5904  5905 -838 -5906 0
 5903  5904  5905 -838 -5907 0
 5903  5904  5905 -838  5908 0

c  1+1 --> 2
c    (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0 ∧  p_838) -> (-b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0)
c  in CNF:
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_2
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨  b^{2, 420}_1
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ -p_838 ∨ -b^{2, 420}_0
c  in DIMACS:
 5903  5904 -5905 -838 -5906 0
 5903  5904 -5905 -838  5907 0
 5903  5904 -5905 -838 -5908 0

c  2+1 --> break 
c    (-b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧  p_838) -> break
c  in CNF:
c     b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ -p_838 ∨ break
c  in DIMACS:
 5903 -5904  5905 -838 1162 0


c  2-1 --> 1
c    (-b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧ -p_838) -> (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0)
c  in CNF:
c     b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_2
c     b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_1
c     b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨  b^{2, 420}_0
c  in DIMACS:
 5903 -5904  5905  838 -5906 0
 5903 -5904  5905  838 -5907 0
 5903 -5904  5905  838  5908 0

c  1-1 --> 0
c    (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0 ∧ -p_838) -> (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧ -b^{2, 420}_0)
c  in CNF:
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_2
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_1
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_0
c  in DIMACS:
 5903  5904 -5905  838 -5906 0
 5903  5904 -5905  838 -5907 0
 5903  5904 -5905  838 -5908 0

c  0-1 --> -1
c    (-b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧ -p_838) -> ( b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0)
c  in CNF:
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨  b^{2, 420}_2
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_1
c     b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨  b^{2, 420}_0
c  in DIMACS:
 5903  5904  5905  838  5906 0
 5903  5904  5905  838 -5907 0
 5903  5904  5905  838  5908 0

c  -1-1 --> -2
c    ( b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧  b^{2, 419}_0 ∧ -p_838) -> ( b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0)
c  in CNF:
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨  b^{2, 420}_2
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨  b^{2, 420}_1
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨  p_838 ∨ -b^{2, 420}_0
c  in DIMACS:
-5903  5904 -5905  838  5906 0
-5903  5904 -5905  838  5907 0
-5903  5904 -5905  838 -5908 0

c  -2-1 --> break 
c    ( b^{2, 419}_2 ∧  b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧ -p_838) -> break
c  in CNF:
c    -b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨  b^{2, 419}_0 ∨  p_838 ∨ break
c  in DIMACS:
-5903 -5904  5905  838 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 419}_2 ∧ -b^{2, 419}_1 ∧ -b^{2, 419}_0 ∧ true) 
c  in CNF:
c    -b^{2, 419}_2 ∨  b^{2, 419}_1 ∨  b^{2, 419}_0 ∨ false 
c  in DIMACS:
-5903  5904  5905  0

c  3 does not represent an automaton state.
c    -(-b^{2, 419}_2 ∧  b^{2, 419}_1 ∧  b^{2, 419}_0 ∧ true) 
c  in CNF:
c     b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ false 
c  in DIMACS:
 5903 -5904 -5905  0
c  -3 does not represent an automaton state.
c    -( b^{2, 419}_2 ∧  b^{2, 419}_1 ∧  b^{2, 419}_0 ∧ true) 
c  in CNF:
c    -b^{2, 419}_2 ∨ -b^{2, 419}_1 ∨ -b^{2, 419}_0 ∨ false 
c  in DIMACS:
-5903 -5904 -5905  0

c i = 420
c  -2+1 --> -1
c    ( b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧  p_840) -> ( b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0)
c  in CNF:
c    -b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨  b^{2, 421}_2
c    -b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_1
c    -b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨  b^{2, 421}_0
c  in DIMACS:
-5906 -5907  5908 -840  5909 0
-5906 -5907  5908 -840 -5910 0
-5906 -5907  5908 -840  5911 0

c  -1+1 --> 0
c    ( b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0 ∧  p_840) -> (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧ -b^{2, 421}_0)
c  in CNF:
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_2
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_1
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_0
c  in DIMACS:
-5906  5907 -5908 -840 -5909 0
-5906  5907 -5908 -840 -5910 0
-5906  5907 -5908 -840 -5911 0

c  0+1 --> 1
c    (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧  p_840) -> (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0)
c  in CNF:
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_2
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_1
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨  b^{2, 421}_0
c  in DIMACS:
 5906  5907  5908 -840 -5909 0
 5906  5907  5908 -840 -5910 0
 5906  5907  5908 -840  5911 0

c  1+1 --> 2
c    (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0 ∧  p_840) -> (-b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0)
c  in CNF:
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_2
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨  b^{2, 421}_1
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ -p_840 ∨ -b^{2, 421}_0
c  in DIMACS:
 5906  5907 -5908 -840 -5909 0
 5906  5907 -5908 -840  5910 0
 5906  5907 -5908 -840 -5911 0

c  2+1 --> break 
c    (-b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧  p_840) -> break
c  in CNF:
c     b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 5906 -5907  5908 -840 1162 0


c  2-1 --> 1
c    (-b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧ -p_840) -> (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0)
c  in CNF:
c     b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_2
c     b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_1
c     b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨  b^{2, 421}_0
c  in DIMACS:
 5906 -5907  5908  840 -5909 0
 5906 -5907  5908  840 -5910 0
 5906 -5907  5908  840  5911 0

c  1-1 --> 0
c    (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0 ∧ -p_840) -> (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧ -b^{2, 421}_0)
c  in CNF:
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_2
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_1
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_0
c  in DIMACS:
 5906  5907 -5908  840 -5909 0
 5906  5907 -5908  840 -5910 0
 5906  5907 -5908  840 -5911 0

c  0-1 --> -1
c    (-b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧ -p_840) -> ( b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0)
c  in CNF:
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨  b^{2, 421}_2
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_1
c     b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨  b^{2, 421}_0
c  in DIMACS:
 5906  5907  5908  840  5909 0
 5906  5907  5908  840 -5910 0
 5906  5907  5908  840  5911 0

c  -1-1 --> -2
c    ( b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧  b^{2, 420}_0 ∧ -p_840) -> ( b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0)
c  in CNF:
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨  b^{2, 421}_2
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨  b^{2, 421}_1
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨  p_840 ∨ -b^{2, 421}_0
c  in DIMACS:
-5906  5907 -5908  840  5909 0
-5906  5907 -5908  840  5910 0
-5906  5907 -5908  840 -5911 0

c  -2-1 --> break 
c    ( b^{2, 420}_2 ∧  b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨  b^{2, 420}_0 ∨  p_840 ∨ break
c  in DIMACS:
-5906 -5907  5908  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 420}_2 ∧ -b^{2, 420}_1 ∧ -b^{2, 420}_0 ∧ true) 
c  in CNF:
c    -b^{2, 420}_2 ∨  b^{2, 420}_1 ∨  b^{2, 420}_0 ∨ false 
c  in DIMACS:
-5906  5907  5908  0

c  3 does not represent an automaton state.
c    -(-b^{2, 420}_2 ∧  b^{2, 420}_1 ∧  b^{2, 420}_0 ∧ true) 
c  in CNF:
c     b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ false 
c  in DIMACS:
 5906 -5907 -5908  0
c  -3 does not represent an automaton state.
c    -( b^{2, 420}_2 ∧  b^{2, 420}_1 ∧  b^{2, 420}_0 ∧ true) 
c  in CNF:
c    -b^{2, 420}_2 ∨ -b^{2, 420}_1 ∨ -b^{2, 420}_0 ∨ false 
c  in DIMACS:
-5906 -5907 -5908  0

c i = 421
c  -2+1 --> -1
c    ( b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧  p_842) -> ( b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0)
c  in CNF:
c    -b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨  b^{2, 422}_2
c    -b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_1
c    -b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨  b^{2, 422}_0
c  in DIMACS:
-5909 -5910  5911 -842  5912 0
-5909 -5910  5911 -842 -5913 0
-5909 -5910  5911 -842  5914 0

c  -1+1 --> 0
c    ( b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0 ∧  p_842) -> (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧ -b^{2, 422}_0)
c  in CNF:
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_2
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_1
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_0
c  in DIMACS:
-5909  5910 -5911 -842 -5912 0
-5909  5910 -5911 -842 -5913 0
-5909  5910 -5911 -842 -5914 0

c  0+1 --> 1
c    (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧  p_842) -> (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0)
c  in CNF:
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_2
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_1
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨  b^{2, 422}_0
c  in DIMACS:
 5909  5910  5911 -842 -5912 0
 5909  5910  5911 -842 -5913 0
 5909  5910  5911 -842  5914 0

c  1+1 --> 2
c    (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0 ∧  p_842) -> (-b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0)
c  in CNF:
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_2
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨  b^{2, 422}_1
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ -p_842 ∨ -b^{2, 422}_0
c  in DIMACS:
 5909  5910 -5911 -842 -5912 0
 5909  5910 -5911 -842  5913 0
 5909  5910 -5911 -842 -5914 0

c  2+1 --> break 
c    (-b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧  p_842) -> break
c  in CNF:
c     b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ -p_842 ∨ break
c  in DIMACS:
 5909 -5910  5911 -842 1162 0


c  2-1 --> 1
c    (-b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧ -p_842) -> (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0)
c  in CNF:
c     b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_2
c     b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_1
c     b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨  b^{2, 422}_0
c  in DIMACS:
 5909 -5910  5911  842 -5912 0
 5909 -5910  5911  842 -5913 0
 5909 -5910  5911  842  5914 0

c  1-1 --> 0
c    (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0 ∧ -p_842) -> (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧ -b^{2, 422}_0)
c  in CNF:
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_2
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_1
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_0
c  in DIMACS:
 5909  5910 -5911  842 -5912 0
 5909  5910 -5911  842 -5913 0
 5909  5910 -5911  842 -5914 0

c  0-1 --> -1
c    (-b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧ -p_842) -> ( b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0)
c  in CNF:
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨  b^{2, 422}_2
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_1
c     b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨  b^{2, 422}_0
c  in DIMACS:
 5909  5910  5911  842  5912 0
 5909  5910  5911  842 -5913 0
 5909  5910  5911  842  5914 0

c  -1-1 --> -2
c    ( b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧  b^{2, 421}_0 ∧ -p_842) -> ( b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0)
c  in CNF:
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨  b^{2, 422}_2
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨  b^{2, 422}_1
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨  p_842 ∨ -b^{2, 422}_0
c  in DIMACS:
-5909  5910 -5911  842  5912 0
-5909  5910 -5911  842  5913 0
-5909  5910 -5911  842 -5914 0

c  -2-1 --> break 
c    ( b^{2, 421}_2 ∧  b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧ -p_842) -> break
c  in CNF:
c    -b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨  b^{2, 421}_0 ∨  p_842 ∨ break
c  in DIMACS:
-5909 -5910  5911  842 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 421}_2 ∧ -b^{2, 421}_1 ∧ -b^{2, 421}_0 ∧ true) 
c  in CNF:
c    -b^{2, 421}_2 ∨  b^{2, 421}_1 ∨  b^{2, 421}_0 ∨ false 
c  in DIMACS:
-5909  5910  5911  0

c  3 does not represent an automaton state.
c    -(-b^{2, 421}_2 ∧  b^{2, 421}_1 ∧  b^{2, 421}_0 ∧ true) 
c  in CNF:
c     b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ false 
c  in DIMACS:
 5909 -5910 -5911  0
c  -3 does not represent an automaton state.
c    -( b^{2, 421}_2 ∧  b^{2, 421}_1 ∧  b^{2, 421}_0 ∧ true) 
c  in CNF:
c    -b^{2, 421}_2 ∨ -b^{2, 421}_1 ∨ -b^{2, 421}_0 ∨ false 
c  in DIMACS:
-5909 -5910 -5911  0

c i = 422
c  -2+1 --> -1
c    ( b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧  p_844) -> ( b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0)
c  in CNF:
c    -b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨  b^{2, 423}_2
c    -b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_1
c    -b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨  b^{2, 423}_0
c  in DIMACS:
-5912 -5913  5914 -844  5915 0
-5912 -5913  5914 -844 -5916 0
-5912 -5913  5914 -844  5917 0

c  -1+1 --> 0
c    ( b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0 ∧  p_844) -> (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧ -b^{2, 423}_0)
c  in CNF:
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_2
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_1
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_0
c  in DIMACS:
-5912  5913 -5914 -844 -5915 0
-5912  5913 -5914 -844 -5916 0
-5912  5913 -5914 -844 -5917 0

c  0+1 --> 1
c    (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧  p_844) -> (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0)
c  in CNF:
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_2
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_1
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨  b^{2, 423}_0
c  in DIMACS:
 5912  5913  5914 -844 -5915 0
 5912  5913  5914 -844 -5916 0
 5912  5913  5914 -844  5917 0

c  1+1 --> 2
c    (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0 ∧  p_844) -> (-b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0)
c  in CNF:
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_2
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨  b^{2, 423}_1
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ -p_844 ∨ -b^{2, 423}_0
c  in DIMACS:
 5912  5913 -5914 -844 -5915 0
 5912  5913 -5914 -844  5916 0
 5912  5913 -5914 -844 -5917 0

c  2+1 --> break 
c    (-b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧  p_844) -> break
c  in CNF:
c     b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ -p_844 ∨ break
c  in DIMACS:
 5912 -5913  5914 -844 1162 0


c  2-1 --> 1
c    (-b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧ -p_844) -> (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0)
c  in CNF:
c     b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_2
c     b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_1
c     b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨  b^{2, 423}_0
c  in DIMACS:
 5912 -5913  5914  844 -5915 0
 5912 -5913  5914  844 -5916 0
 5912 -5913  5914  844  5917 0

c  1-1 --> 0
c    (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0 ∧ -p_844) -> (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧ -b^{2, 423}_0)
c  in CNF:
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_2
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_1
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_0
c  in DIMACS:
 5912  5913 -5914  844 -5915 0
 5912  5913 -5914  844 -5916 0
 5912  5913 -5914  844 -5917 0

c  0-1 --> -1
c    (-b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧ -p_844) -> ( b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0)
c  in CNF:
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨  b^{2, 423}_2
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_1
c     b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨  b^{2, 423}_0
c  in DIMACS:
 5912  5913  5914  844  5915 0
 5912  5913  5914  844 -5916 0
 5912  5913  5914  844  5917 0

c  -1-1 --> -2
c    ( b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧  b^{2, 422}_0 ∧ -p_844) -> ( b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0)
c  in CNF:
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨  b^{2, 423}_2
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨  b^{2, 423}_1
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨  p_844 ∨ -b^{2, 423}_0
c  in DIMACS:
-5912  5913 -5914  844  5915 0
-5912  5913 -5914  844  5916 0
-5912  5913 -5914  844 -5917 0

c  -2-1 --> break 
c    ( b^{2, 422}_2 ∧  b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧ -p_844) -> break
c  in CNF:
c    -b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨  b^{2, 422}_0 ∨  p_844 ∨ break
c  in DIMACS:
-5912 -5913  5914  844 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 422}_2 ∧ -b^{2, 422}_1 ∧ -b^{2, 422}_0 ∧ true) 
c  in CNF:
c    -b^{2, 422}_2 ∨  b^{2, 422}_1 ∨  b^{2, 422}_0 ∨ false 
c  in DIMACS:
-5912  5913  5914  0

c  3 does not represent an automaton state.
c    -(-b^{2, 422}_2 ∧  b^{2, 422}_1 ∧  b^{2, 422}_0 ∧ true) 
c  in CNF:
c     b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ false 
c  in DIMACS:
 5912 -5913 -5914  0
c  -3 does not represent an automaton state.
c    -( b^{2, 422}_2 ∧  b^{2, 422}_1 ∧  b^{2, 422}_0 ∧ true) 
c  in CNF:
c    -b^{2, 422}_2 ∨ -b^{2, 422}_1 ∨ -b^{2, 422}_0 ∨ false 
c  in DIMACS:
-5912 -5913 -5914  0

c i = 423
c  -2+1 --> -1
c    ( b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧  p_846) -> ( b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0)
c  in CNF:
c    -b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨  b^{2, 424}_2
c    -b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_1
c    -b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨  b^{2, 424}_0
c  in DIMACS:
-5915 -5916  5917 -846  5918 0
-5915 -5916  5917 -846 -5919 0
-5915 -5916  5917 -846  5920 0

c  -1+1 --> 0
c    ( b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0 ∧  p_846) -> (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧ -b^{2, 424}_0)
c  in CNF:
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_2
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_1
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_0
c  in DIMACS:
-5915  5916 -5917 -846 -5918 0
-5915  5916 -5917 -846 -5919 0
-5915  5916 -5917 -846 -5920 0

c  0+1 --> 1
c    (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧  p_846) -> (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0)
c  in CNF:
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_2
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_1
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨  b^{2, 424}_0
c  in DIMACS:
 5915  5916  5917 -846 -5918 0
 5915  5916  5917 -846 -5919 0
 5915  5916  5917 -846  5920 0

c  1+1 --> 2
c    (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0 ∧  p_846) -> (-b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0)
c  in CNF:
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_2
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨  b^{2, 424}_1
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ -p_846 ∨ -b^{2, 424}_0
c  in DIMACS:
 5915  5916 -5917 -846 -5918 0
 5915  5916 -5917 -846  5919 0
 5915  5916 -5917 -846 -5920 0

c  2+1 --> break 
c    (-b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧  p_846) -> break
c  in CNF:
c     b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 5915 -5916  5917 -846 1162 0


c  2-1 --> 1
c    (-b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧ -p_846) -> (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0)
c  in CNF:
c     b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_2
c     b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_1
c     b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨  b^{2, 424}_0
c  in DIMACS:
 5915 -5916  5917  846 -5918 0
 5915 -5916  5917  846 -5919 0
 5915 -5916  5917  846  5920 0

c  1-1 --> 0
c    (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0 ∧ -p_846) -> (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧ -b^{2, 424}_0)
c  in CNF:
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_2
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_1
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_0
c  in DIMACS:
 5915  5916 -5917  846 -5918 0
 5915  5916 -5917  846 -5919 0
 5915  5916 -5917  846 -5920 0

c  0-1 --> -1
c    (-b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧ -p_846) -> ( b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0)
c  in CNF:
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨  b^{2, 424}_2
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_1
c     b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨  b^{2, 424}_0
c  in DIMACS:
 5915  5916  5917  846  5918 0
 5915  5916  5917  846 -5919 0
 5915  5916  5917  846  5920 0

c  -1-1 --> -2
c    ( b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧  b^{2, 423}_0 ∧ -p_846) -> ( b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0)
c  in CNF:
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨  b^{2, 424}_2
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨  b^{2, 424}_1
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨  p_846 ∨ -b^{2, 424}_0
c  in DIMACS:
-5915  5916 -5917  846  5918 0
-5915  5916 -5917  846  5919 0
-5915  5916 -5917  846 -5920 0

c  -2-1 --> break 
c    ( b^{2, 423}_2 ∧  b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨  b^{2, 423}_0 ∨  p_846 ∨ break
c  in DIMACS:
-5915 -5916  5917  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 423}_2 ∧ -b^{2, 423}_1 ∧ -b^{2, 423}_0 ∧ true) 
c  in CNF:
c    -b^{2, 423}_2 ∨  b^{2, 423}_1 ∨  b^{2, 423}_0 ∨ false 
c  in DIMACS:
-5915  5916  5917  0

c  3 does not represent an automaton state.
c    -(-b^{2, 423}_2 ∧  b^{2, 423}_1 ∧  b^{2, 423}_0 ∧ true) 
c  in CNF:
c     b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ false 
c  in DIMACS:
 5915 -5916 -5917  0
c  -3 does not represent an automaton state.
c    -( b^{2, 423}_2 ∧  b^{2, 423}_1 ∧  b^{2, 423}_0 ∧ true) 
c  in CNF:
c    -b^{2, 423}_2 ∨ -b^{2, 423}_1 ∨ -b^{2, 423}_0 ∨ false 
c  in DIMACS:
-5915 -5916 -5917  0

c i = 424
c  -2+1 --> -1
c    ( b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧  p_848) -> ( b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0)
c  in CNF:
c    -b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨  b^{2, 425}_2
c    -b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_1
c    -b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨  b^{2, 425}_0
c  in DIMACS:
-5918 -5919  5920 -848  5921 0
-5918 -5919  5920 -848 -5922 0
-5918 -5919  5920 -848  5923 0

c  -1+1 --> 0
c    ( b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0 ∧  p_848) -> (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧ -b^{2, 425}_0)
c  in CNF:
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_2
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_1
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_0
c  in DIMACS:
-5918  5919 -5920 -848 -5921 0
-5918  5919 -5920 -848 -5922 0
-5918  5919 -5920 -848 -5923 0

c  0+1 --> 1
c    (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧  p_848) -> (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0)
c  in CNF:
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_2
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_1
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨  b^{2, 425}_0
c  in DIMACS:
 5918  5919  5920 -848 -5921 0
 5918  5919  5920 -848 -5922 0
 5918  5919  5920 -848  5923 0

c  1+1 --> 2
c    (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0 ∧  p_848) -> (-b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0)
c  in CNF:
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_2
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨  b^{2, 425}_1
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ -p_848 ∨ -b^{2, 425}_0
c  in DIMACS:
 5918  5919 -5920 -848 -5921 0
 5918  5919 -5920 -848  5922 0
 5918  5919 -5920 -848 -5923 0

c  2+1 --> break 
c    (-b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧  p_848) -> break
c  in CNF:
c     b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 5918 -5919  5920 -848 1162 0


c  2-1 --> 1
c    (-b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧ -p_848) -> (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0)
c  in CNF:
c     b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_2
c     b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_1
c     b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨  b^{2, 425}_0
c  in DIMACS:
 5918 -5919  5920  848 -5921 0
 5918 -5919  5920  848 -5922 0
 5918 -5919  5920  848  5923 0

c  1-1 --> 0
c    (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0 ∧ -p_848) -> (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧ -b^{2, 425}_0)
c  in CNF:
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_2
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_1
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_0
c  in DIMACS:
 5918  5919 -5920  848 -5921 0
 5918  5919 -5920  848 -5922 0
 5918  5919 -5920  848 -5923 0

c  0-1 --> -1
c    (-b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧ -p_848) -> ( b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0)
c  in CNF:
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨  b^{2, 425}_2
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_1
c     b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨  b^{2, 425}_0
c  in DIMACS:
 5918  5919  5920  848  5921 0
 5918  5919  5920  848 -5922 0
 5918  5919  5920  848  5923 0

c  -1-1 --> -2
c    ( b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧  b^{2, 424}_0 ∧ -p_848) -> ( b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0)
c  in CNF:
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨  b^{2, 425}_2
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨  b^{2, 425}_1
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨  p_848 ∨ -b^{2, 425}_0
c  in DIMACS:
-5918  5919 -5920  848  5921 0
-5918  5919 -5920  848  5922 0
-5918  5919 -5920  848 -5923 0

c  -2-1 --> break 
c    ( b^{2, 424}_2 ∧  b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨  b^{2, 424}_0 ∨  p_848 ∨ break
c  in DIMACS:
-5918 -5919  5920  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 424}_2 ∧ -b^{2, 424}_1 ∧ -b^{2, 424}_0 ∧ true) 
c  in CNF:
c    -b^{2, 424}_2 ∨  b^{2, 424}_1 ∨  b^{2, 424}_0 ∨ false 
c  in DIMACS:
-5918  5919  5920  0

c  3 does not represent an automaton state.
c    -(-b^{2, 424}_2 ∧  b^{2, 424}_1 ∧  b^{2, 424}_0 ∧ true) 
c  in CNF:
c     b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ false 
c  in DIMACS:
 5918 -5919 -5920  0
c  -3 does not represent an automaton state.
c    -( b^{2, 424}_2 ∧  b^{2, 424}_1 ∧  b^{2, 424}_0 ∧ true) 
c  in CNF:
c    -b^{2, 424}_2 ∨ -b^{2, 424}_1 ∨ -b^{2, 424}_0 ∨ false 
c  in DIMACS:
-5918 -5919 -5920  0

c i = 425
c  -2+1 --> -1
c    ( b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧  p_850) -> ( b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0)
c  in CNF:
c    -b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨  b^{2, 426}_2
c    -b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_1
c    -b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨  b^{2, 426}_0
c  in DIMACS:
-5921 -5922  5923 -850  5924 0
-5921 -5922  5923 -850 -5925 0
-5921 -5922  5923 -850  5926 0

c  -1+1 --> 0
c    ( b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0 ∧  p_850) -> (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧ -b^{2, 426}_0)
c  in CNF:
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_2
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_1
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_0
c  in DIMACS:
-5921  5922 -5923 -850 -5924 0
-5921  5922 -5923 -850 -5925 0
-5921  5922 -5923 -850 -5926 0

c  0+1 --> 1
c    (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧  p_850) -> (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0)
c  in CNF:
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_2
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_1
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨  b^{2, 426}_0
c  in DIMACS:
 5921  5922  5923 -850 -5924 0
 5921  5922  5923 -850 -5925 0
 5921  5922  5923 -850  5926 0

c  1+1 --> 2
c    (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0 ∧  p_850) -> (-b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0)
c  in CNF:
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_2
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨  b^{2, 426}_1
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ -p_850 ∨ -b^{2, 426}_0
c  in DIMACS:
 5921  5922 -5923 -850 -5924 0
 5921  5922 -5923 -850  5925 0
 5921  5922 -5923 -850 -5926 0

c  2+1 --> break 
c    (-b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧  p_850) -> break
c  in CNF:
c     b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 5921 -5922  5923 -850 1162 0


c  2-1 --> 1
c    (-b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧ -p_850) -> (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0)
c  in CNF:
c     b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_2
c     b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_1
c     b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨  b^{2, 426}_0
c  in DIMACS:
 5921 -5922  5923  850 -5924 0
 5921 -5922  5923  850 -5925 0
 5921 -5922  5923  850  5926 0

c  1-1 --> 0
c    (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0 ∧ -p_850) -> (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧ -b^{2, 426}_0)
c  in CNF:
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_2
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_1
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_0
c  in DIMACS:
 5921  5922 -5923  850 -5924 0
 5921  5922 -5923  850 -5925 0
 5921  5922 -5923  850 -5926 0

c  0-1 --> -1
c    (-b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧ -p_850) -> ( b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0)
c  in CNF:
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨  b^{2, 426}_2
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_1
c     b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨  b^{2, 426}_0
c  in DIMACS:
 5921  5922  5923  850  5924 0
 5921  5922  5923  850 -5925 0
 5921  5922  5923  850  5926 0

c  -1-1 --> -2
c    ( b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧  b^{2, 425}_0 ∧ -p_850) -> ( b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0)
c  in CNF:
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨  b^{2, 426}_2
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨  b^{2, 426}_1
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨  p_850 ∨ -b^{2, 426}_0
c  in DIMACS:
-5921  5922 -5923  850  5924 0
-5921  5922 -5923  850  5925 0
-5921  5922 -5923  850 -5926 0

c  -2-1 --> break 
c    ( b^{2, 425}_2 ∧  b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨  b^{2, 425}_0 ∨  p_850 ∨ break
c  in DIMACS:
-5921 -5922  5923  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 425}_2 ∧ -b^{2, 425}_1 ∧ -b^{2, 425}_0 ∧ true) 
c  in CNF:
c    -b^{2, 425}_2 ∨  b^{2, 425}_1 ∨  b^{2, 425}_0 ∨ false 
c  in DIMACS:
-5921  5922  5923  0

c  3 does not represent an automaton state.
c    -(-b^{2, 425}_2 ∧  b^{2, 425}_1 ∧  b^{2, 425}_0 ∧ true) 
c  in CNF:
c     b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ false 
c  in DIMACS:
 5921 -5922 -5923  0
c  -3 does not represent an automaton state.
c    -( b^{2, 425}_2 ∧  b^{2, 425}_1 ∧  b^{2, 425}_0 ∧ true) 
c  in CNF:
c    -b^{2, 425}_2 ∨ -b^{2, 425}_1 ∨ -b^{2, 425}_0 ∨ false 
c  in DIMACS:
-5921 -5922 -5923  0

c i = 426
c  -2+1 --> -1
c    ( b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧  p_852) -> ( b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0)
c  in CNF:
c    -b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨  b^{2, 427}_2
c    -b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_1
c    -b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨  b^{2, 427}_0
c  in DIMACS:
-5924 -5925  5926 -852  5927 0
-5924 -5925  5926 -852 -5928 0
-5924 -5925  5926 -852  5929 0

c  -1+1 --> 0
c    ( b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0 ∧  p_852) -> (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧ -b^{2, 427}_0)
c  in CNF:
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_2
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_1
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_0
c  in DIMACS:
-5924  5925 -5926 -852 -5927 0
-5924  5925 -5926 -852 -5928 0
-5924  5925 -5926 -852 -5929 0

c  0+1 --> 1
c    (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧  p_852) -> (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0)
c  in CNF:
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_2
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_1
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨  b^{2, 427}_0
c  in DIMACS:
 5924  5925  5926 -852 -5927 0
 5924  5925  5926 -852 -5928 0
 5924  5925  5926 -852  5929 0

c  1+1 --> 2
c    (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0 ∧  p_852) -> (-b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0)
c  in CNF:
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_2
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨  b^{2, 427}_1
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ -p_852 ∨ -b^{2, 427}_0
c  in DIMACS:
 5924  5925 -5926 -852 -5927 0
 5924  5925 -5926 -852  5928 0
 5924  5925 -5926 -852 -5929 0

c  2+1 --> break 
c    (-b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧  p_852) -> break
c  in CNF:
c     b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 5924 -5925  5926 -852 1162 0


c  2-1 --> 1
c    (-b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧ -p_852) -> (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0)
c  in CNF:
c     b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_2
c     b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_1
c     b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨  b^{2, 427}_0
c  in DIMACS:
 5924 -5925  5926  852 -5927 0
 5924 -5925  5926  852 -5928 0
 5924 -5925  5926  852  5929 0

c  1-1 --> 0
c    (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0 ∧ -p_852) -> (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧ -b^{2, 427}_0)
c  in CNF:
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_2
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_1
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_0
c  in DIMACS:
 5924  5925 -5926  852 -5927 0
 5924  5925 -5926  852 -5928 0
 5924  5925 -5926  852 -5929 0

c  0-1 --> -1
c    (-b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧ -p_852) -> ( b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0)
c  in CNF:
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨  b^{2, 427}_2
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_1
c     b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨  b^{2, 427}_0
c  in DIMACS:
 5924  5925  5926  852  5927 0
 5924  5925  5926  852 -5928 0
 5924  5925  5926  852  5929 0

c  -1-1 --> -2
c    ( b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧  b^{2, 426}_0 ∧ -p_852) -> ( b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0)
c  in CNF:
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨  b^{2, 427}_2
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨  b^{2, 427}_1
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨  p_852 ∨ -b^{2, 427}_0
c  in DIMACS:
-5924  5925 -5926  852  5927 0
-5924  5925 -5926  852  5928 0
-5924  5925 -5926  852 -5929 0

c  -2-1 --> break 
c    ( b^{2, 426}_2 ∧  b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨  b^{2, 426}_0 ∨  p_852 ∨ break
c  in DIMACS:
-5924 -5925  5926  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 426}_2 ∧ -b^{2, 426}_1 ∧ -b^{2, 426}_0 ∧ true) 
c  in CNF:
c    -b^{2, 426}_2 ∨  b^{2, 426}_1 ∨  b^{2, 426}_0 ∨ false 
c  in DIMACS:
-5924  5925  5926  0

c  3 does not represent an automaton state.
c    -(-b^{2, 426}_2 ∧  b^{2, 426}_1 ∧  b^{2, 426}_0 ∧ true) 
c  in CNF:
c     b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ false 
c  in DIMACS:
 5924 -5925 -5926  0
c  -3 does not represent an automaton state.
c    -( b^{2, 426}_2 ∧  b^{2, 426}_1 ∧  b^{2, 426}_0 ∧ true) 
c  in CNF:
c    -b^{2, 426}_2 ∨ -b^{2, 426}_1 ∨ -b^{2, 426}_0 ∨ false 
c  in DIMACS:
-5924 -5925 -5926  0

c i = 427
c  -2+1 --> -1
c    ( b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧  p_854) -> ( b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0)
c  in CNF:
c    -b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨  b^{2, 428}_2
c    -b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_1
c    -b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨  b^{2, 428}_0
c  in DIMACS:
-5927 -5928  5929 -854  5930 0
-5927 -5928  5929 -854 -5931 0
-5927 -5928  5929 -854  5932 0

c  -1+1 --> 0
c    ( b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0 ∧  p_854) -> (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧ -b^{2, 428}_0)
c  in CNF:
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_2
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_1
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_0
c  in DIMACS:
-5927  5928 -5929 -854 -5930 0
-5927  5928 -5929 -854 -5931 0
-5927  5928 -5929 -854 -5932 0

c  0+1 --> 1
c    (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧  p_854) -> (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0)
c  in CNF:
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_2
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_1
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨  b^{2, 428}_0
c  in DIMACS:
 5927  5928  5929 -854 -5930 0
 5927  5928  5929 -854 -5931 0
 5927  5928  5929 -854  5932 0

c  1+1 --> 2
c    (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0 ∧  p_854) -> (-b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0)
c  in CNF:
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_2
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨  b^{2, 428}_1
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ -p_854 ∨ -b^{2, 428}_0
c  in DIMACS:
 5927  5928 -5929 -854 -5930 0
 5927  5928 -5929 -854  5931 0
 5927  5928 -5929 -854 -5932 0

c  2+1 --> break 
c    (-b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧  p_854) -> break
c  in CNF:
c     b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 5927 -5928  5929 -854 1162 0


c  2-1 --> 1
c    (-b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧ -p_854) -> (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0)
c  in CNF:
c     b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_2
c     b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_1
c     b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨  b^{2, 428}_0
c  in DIMACS:
 5927 -5928  5929  854 -5930 0
 5927 -5928  5929  854 -5931 0
 5927 -5928  5929  854  5932 0

c  1-1 --> 0
c    (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0 ∧ -p_854) -> (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧ -b^{2, 428}_0)
c  in CNF:
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_2
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_1
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_0
c  in DIMACS:
 5927  5928 -5929  854 -5930 0
 5927  5928 -5929  854 -5931 0
 5927  5928 -5929  854 -5932 0

c  0-1 --> -1
c    (-b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧ -p_854) -> ( b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0)
c  in CNF:
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨  b^{2, 428}_2
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_1
c     b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨  b^{2, 428}_0
c  in DIMACS:
 5927  5928  5929  854  5930 0
 5927  5928  5929  854 -5931 0
 5927  5928  5929  854  5932 0

c  -1-1 --> -2
c    ( b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧  b^{2, 427}_0 ∧ -p_854) -> ( b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0)
c  in CNF:
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨  b^{2, 428}_2
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨  b^{2, 428}_1
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨  p_854 ∨ -b^{2, 428}_0
c  in DIMACS:
-5927  5928 -5929  854  5930 0
-5927  5928 -5929  854  5931 0
-5927  5928 -5929  854 -5932 0

c  -2-1 --> break 
c    ( b^{2, 427}_2 ∧  b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨  b^{2, 427}_0 ∨  p_854 ∨ break
c  in DIMACS:
-5927 -5928  5929  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 427}_2 ∧ -b^{2, 427}_1 ∧ -b^{2, 427}_0 ∧ true) 
c  in CNF:
c    -b^{2, 427}_2 ∨  b^{2, 427}_1 ∨  b^{2, 427}_0 ∨ false 
c  in DIMACS:
-5927  5928  5929  0

c  3 does not represent an automaton state.
c    -(-b^{2, 427}_2 ∧  b^{2, 427}_1 ∧  b^{2, 427}_0 ∧ true) 
c  in CNF:
c     b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ false 
c  in DIMACS:
 5927 -5928 -5929  0
c  -3 does not represent an automaton state.
c    -( b^{2, 427}_2 ∧  b^{2, 427}_1 ∧  b^{2, 427}_0 ∧ true) 
c  in CNF:
c    -b^{2, 427}_2 ∨ -b^{2, 427}_1 ∨ -b^{2, 427}_0 ∨ false 
c  in DIMACS:
-5927 -5928 -5929  0

c i = 428
c  -2+1 --> -1
c    ( b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧  p_856) -> ( b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0)
c  in CNF:
c    -b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨  b^{2, 429}_2
c    -b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_1
c    -b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨  b^{2, 429}_0
c  in DIMACS:
-5930 -5931  5932 -856  5933 0
-5930 -5931  5932 -856 -5934 0
-5930 -5931  5932 -856  5935 0

c  -1+1 --> 0
c    ( b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0 ∧  p_856) -> (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧ -b^{2, 429}_0)
c  in CNF:
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_2
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_1
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_0
c  in DIMACS:
-5930  5931 -5932 -856 -5933 0
-5930  5931 -5932 -856 -5934 0
-5930  5931 -5932 -856 -5935 0

c  0+1 --> 1
c    (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧  p_856) -> (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0)
c  in CNF:
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_2
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_1
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨  b^{2, 429}_0
c  in DIMACS:
 5930  5931  5932 -856 -5933 0
 5930  5931  5932 -856 -5934 0
 5930  5931  5932 -856  5935 0

c  1+1 --> 2
c    (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0 ∧  p_856) -> (-b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0)
c  in CNF:
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_2
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨  b^{2, 429}_1
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ -p_856 ∨ -b^{2, 429}_0
c  in DIMACS:
 5930  5931 -5932 -856 -5933 0
 5930  5931 -5932 -856  5934 0
 5930  5931 -5932 -856 -5935 0

c  2+1 --> break 
c    (-b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧  p_856) -> break
c  in CNF:
c     b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 5930 -5931  5932 -856 1162 0


c  2-1 --> 1
c    (-b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧ -p_856) -> (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0)
c  in CNF:
c     b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_2
c     b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_1
c     b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨  b^{2, 429}_0
c  in DIMACS:
 5930 -5931  5932  856 -5933 0
 5930 -5931  5932  856 -5934 0
 5930 -5931  5932  856  5935 0

c  1-1 --> 0
c    (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0 ∧ -p_856) -> (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧ -b^{2, 429}_0)
c  in CNF:
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_2
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_1
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_0
c  in DIMACS:
 5930  5931 -5932  856 -5933 0
 5930  5931 -5932  856 -5934 0
 5930  5931 -5932  856 -5935 0

c  0-1 --> -1
c    (-b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧ -p_856) -> ( b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0)
c  in CNF:
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨  b^{2, 429}_2
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_1
c     b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨  b^{2, 429}_0
c  in DIMACS:
 5930  5931  5932  856  5933 0
 5930  5931  5932  856 -5934 0
 5930  5931  5932  856  5935 0

c  -1-1 --> -2
c    ( b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧  b^{2, 428}_0 ∧ -p_856) -> ( b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0)
c  in CNF:
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨  b^{2, 429}_2
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨  b^{2, 429}_1
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨  p_856 ∨ -b^{2, 429}_0
c  in DIMACS:
-5930  5931 -5932  856  5933 0
-5930  5931 -5932  856  5934 0
-5930  5931 -5932  856 -5935 0

c  -2-1 --> break 
c    ( b^{2, 428}_2 ∧  b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨  b^{2, 428}_0 ∨  p_856 ∨ break
c  in DIMACS:
-5930 -5931  5932  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 428}_2 ∧ -b^{2, 428}_1 ∧ -b^{2, 428}_0 ∧ true) 
c  in CNF:
c    -b^{2, 428}_2 ∨  b^{2, 428}_1 ∨  b^{2, 428}_0 ∨ false 
c  in DIMACS:
-5930  5931  5932  0

c  3 does not represent an automaton state.
c    -(-b^{2, 428}_2 ∧  b^{2, 428}_1 ∧  b^{2, 428}_0 ∧ true) 
c  in CNF:
c     b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ false 
c  in DIMACS:
 5930 -5931 -5932  0
c  -3 does not represent an automaton state.
c    -( b^{2, 428}_2 ∧  b^{2, 428}_1 ∧  b^{2, 428}_0 ∧ true) 
c  in CNF:
c    -b^{2, 428}_2 ∨ -b^{2, 428}_1 ∨ -b^{2, 428}_0 ∨ false 
c  in DIMACS:
-5930 -5931 -5932  0

c i = 429
c  -2+1 --> -1
c    ( b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧  p_858) -> ( b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0)
c  in CNF:
c    -b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨  b^{2, 430}_2
c    -b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_1
c    -b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨  b^{2, 430}_0
c  in DIMACS:
-5933 -5934  5935 -858  5936 0
-5933 -5934  5935 -858 -5937 0
-5933 -5934  5935 -858  5938 0

c  -1+1 --> 0
c    ( b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0 ∧  p_858) -> (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧ -b^{2, 430}_0)
c  in CNF:
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_2
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_1
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_0
c  in DIMACS:
-5933  5934 -5935 -858 -5936 0
-5933  5934 -5935 -858 -5937 0
-5933  5934 -5935 -858 -5938 0

c  0+1 --> 1
c    (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧  p_858) -> (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0)
c  in CNF:
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_2
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_1
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨  b^{2, 430}_0
c  in DIMACS:
 5933  5934  5935 -858 -5936 0
 5933  5934  5935 -858 -5937 0
 5933  5934  5935 -858  5938 0

c  1+1 --> 2
c    (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0 ∧  p_858) -> (-b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0)
c  in CNF:
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_2
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨  b^{2, 430}_1
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ -p_858 ∨ -b^{2, 430}_0
c  in DIMACS:
 5933  5934 -5935 -858 -5936 0
 5933  5934 -5935 -858  5937 0
 5933  5934 -5935 -858 -5938 0

c  2+1 --> break 
c    (-b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧  p_858) -> break
c  in CNF:
c     b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 5933 -5934  5935 -858 1162 0


c  2-1 --> 1
c    (-b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧ -p_858) -> (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0)
c  in CNF:
c     b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_2
c     b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_1
c     b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨  b^{2, 430}_0
c  in DIMACS:
 5933 -5934  5935  858 -5936 0
 5933 -5934  5935  858 -5937 0
 5933 -5934  5935  858  5938 0

c  1-1 --> 0
c    (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0 ∧ -p_858) -> (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧ -b^{2, 430}_0)
c  in CNF:
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_2
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_1
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_0
c  in DIMACS:
 5933  5934 -5935  858 -5936 0
 5933  5934 -5935  858 -5937 0
 5933  5934 -5935  858 -5938 0

c  0-1 --> -1
c    (-b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧ -p_858) -> ( b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0)
c  in CNF:
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨  b^{2, 430}_2
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_1
c     b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨  b^{2, 430}_0
c  in DIMACS:
 5933  5934  5935  858  5936 0
 5933  5934  5935  858 -5937 0
 5933  5934  5935  858  5938 0

c  -1-1 --> -2
c    ( b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧  b^{2, 429}_0 ∧ -p_858) -> ( b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0)
c  in CNF:
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨  b^{2, 430}_2
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨  b^{2, 430}_1
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨  p_858 ∨ -b^{2, 430}_0
c  in DIMACS:
-5933  5934 -5935  858  5936 0
-5933  5934 -5935  858  5937 0
-5933  5934 -5935  858 -5938 0

c  -2-1 --> break 
c    ( b^{2, 429}_2 ∧  b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨  b^{2, 429}_0 ∨  p_858 ∨ break
c  in DIMACS:
-5933 -5934  5935  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 429}_2 ∧ -b^{2, 429}_1 ∧ -b^{2, 429}_0 ∧ true) 
c  in CNF:
c    -b^{2, 429}_2 ∨  b^{2, 429}_1 ∨  b^{2, 429}_0 ∨ false 
c  in DIMACS:
-5933  5934  5935  0

c  3 does not represent an automaton state.
c    -(-b^{2, 429}_2 ∧  b^{2, 429}_1 ∧  b^{2, 429}_0 ∧ true) 
c  in CNF:
c     b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ false 
c  in DIMACS:
 5933 -5934 -5935  0
c  -3 does not represent an automaton state.
c    -( b^{2, 429}_2 ∧  b^{2, 429}_1 ∧  b^{2, 429}_0 ∧ true) 
c  in CNF:
c    -b^{2, 429}_2 ∨ -b^{2, 429}_1 ∨ -b^{2, 429}_0 ∨ false 
c  in DIMACS:
-5933 -5934 -5935  0

c i = 430
c  -2+1 --> -1
c    ( b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧  p_860) -> ( b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0)
c  in CNF:
c    -b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨  b^{2, 431}_2
c    -b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_1
c    -b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨  b^{2, 431}_0
c  in DIMACS:
-5936 -5937  5938 -860  5939 0
-5936 -5937  5938 -860 -5940 0
-5936 -5937  5938 -860  5941 0

c  -1+1 --> 0
c    ( b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0 ∧  p_860) -> (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧ -b^{2, 431}_0)
c  in CNF:
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_2
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_1
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_0
c  in DIMACS:
-5936  5937 -5938 -860 -5939 0
-5936  5937 -5938 -860 -5940 0
-5936  5937 -5938 -860 -5941 0

c  0+1 --> 1
c    (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧  p_860) -> (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0)
c  in CNF:
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_2
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_1
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨  b^{2, 431}_0
c  in DIMACS:
 5936  5937  5938 -860 -5939 0
 5936  5937  5938 -860 -5940 0
 5936  5937  5938 -860  5941 0

c  1+1 --> 2
c    (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0 ∧  p_860) -> (-b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0)
c  in CNF:
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_2
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨  b^{2, 431}_1
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ -p_860 ∨ -b^{2, 431}_0
c  in DIMACS:
 5936  5937 -5938 -860 -5939 0
 5936  5937 -5938 -860  5940 0
 5936  5937 -5938 -860 -5941 0

c  2+1 --> break 
c    (-b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧  p_860) -> break
c  in CNF:
c     b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 5936 -5937  5938 -860 1162 0


c  2-1 --> 1
c    (-b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧ -p_860) -> (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0)
c  in CNF:
c     b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_2
c     b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_1
c     b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨  b^{2, 431}_0
c  in DIMACS:
 5936 -5937  5938  860 -5939 0
 5936 -5937  5938  860 -5940 0
 5936 -5937  5938  860  5941 0

c  1-1 --> 0
c    (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0 ∧ -p_860) -> (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧ -b^{2, 431}_0)
c  in CNF:
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_2
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_1
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_0
c  in DIMACS:
 5936  5937 -5938  860 -5939 0
 5936  5937 -5938  860 -5940 0
 5936  5937 -5938  860 -5941 0

c  0-1 --> -1
c    (-b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧ -p_860) -> ( b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0)
c  in CNF:
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨  b^{2, 431}_2
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_1
c     b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨  b^{2, 431}_0
c  in DIMACS:
 5936  5937  5938  860  5939 0
 5936  5937  5938  860 -5940 0
 5936  5937  5938  860  5941 0

c  -1-1 --> -2
c    ( b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧  b^{2, 430}_0 ∧ -p_860) -> ( b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0)
c  in CNF:
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨  b^{2, 431}_2
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨  b^{2, 431}_1
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨  p_860 ∨ -b^{2, 431}_0
c  in DIMACS:
-5936  5937 -5938  860  5939 0
-5936  5937 -5938  860  5940 0
-5936  5937 -5938  860 -5941 0

c  -2-1 --> break 
c    ( b^{2, 430}_2 ∧  b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨  b^{2, 430}_0 ∨  p_860 ∨ break
c  in DIMACS:
-5936 -5937  5938  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 430}_2 ∧ -b^{2, 430}_1 ∧ -b^{2, 430}_0 ∧ true) 
c  in CNF:
c    -b^{2, 430}_2 ∨  b^{2, 430}_1 ∨  b^{2, 430}_0 ∨ false 
c  in DIMACS:
-5936  5937  5938  0

c  3 does not represent an automaton state.
c    -(-b^{2, 430}_2 ∧  b^{2, 430}_1 ∧  b^{2, 430}_0 ∧ true) 
c  in CNF:
c     b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ false 
c  in DIMACS:
 5936 -5937 -5938  0
c  -3 does not represent an automaton state.
c    -( b^{2, 430}_2 ∧  b^{2, 430}_1 ∧  b^{2, 430}_0 ∧ true) 
c  in CNF:
c    -b^{2, 430}_2 ∨ -b^{2, 430}_1 ∨ -b^{2, 430}_0 ∨ false 
c  in DIMACS:
-5936 -5937 -5938  0

c i = 431
c  -2+1 --> -1
c    ( b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧  p_862) -> ( b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0)
c  in CNF:
c    -b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨  b^{2, 432}_2
c    -b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_1
c    -b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨  b^{2, 432}_0
c  in DIMACS:
-5939 -5940  5941 -862  5942 0
-5939 -5940  5941 -862 -5943 0
-5939 -5940  5941 -862  5944 0

c  -1+1 --> 0
c    ( b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0 ∧  p_862) -> (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧ -b^{2, 432}_0)
c  in CNF:
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_2
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_1
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_0
c  in DIMACS:
-5939  5940 -5941 -862 -5942 0
-5939  5940 -5941 -862 -5943 0
-5939  5940 -5941 -862 -5944 0

c  0+1 --> 1
c    (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧  p_862) -> (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0)
c  in CNF:
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_2
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_1
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨  b^{2, 432}_0
c  in DIMACS:
 5939  5940  5941 -862 -5942 0
 5939  5940  5941 -862 -5943 0
 5939  5940  5941 -862  5944 0

c  1+1 --> 2
c    (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0 ∧  p_862) -> (-b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0)
c  in CNF:
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_2
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨  b^{2, 432}_1
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ -p_862 ∨ -b^{2, 432}_0
c  in DIMACS:
 5939  5940 -5941 -862 -5942 0
 5939  5940 -5941 -862  5943 0
 5939  5940 -5941 -862 -5944 0

c  2+1 --> break 
c    (-b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧  p_862) -> break
c  in CNF:
c     b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ -p_862 ∨ break
c  in DIMACS:
 5939 -5940  5941 -862 1162 0


c  2-1 --> 1
c    (-b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧ -p_862) -> (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0)
c  in CNF:
c     b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_2
c     b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_1
c     b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨  b^{2, 432}_0
c  in DIMACS:
 5939 -5940  5941  862 -5942 0
 5939 -5940  5941  862 -5943 0
 5939 -5940  5941  862  5944 0

c  1-1 --> 0
c    (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0 ∧ -p_862) -> (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧ -b^{2, 432}_0)
c  in CNF:
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_2
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_1
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_0
c  in DIMACS:
 5939  5940 -5941  862 -5942 0
 5939  5940 -5941  862 -5943 0
 5939  5940 -5941  862 -5944 0

c  0-1 --> -1
c    (-b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧ -p_862) -> ( b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0)
c  in CNF:
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨  b^{2, 432}_2
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_1
c     b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨  b^{2, 432}_0
c  in DIMACS:
 5939  5940  5941  862  5942 0
 5939  5940  5941  862 -5943 0
 5939  5940  5941  862  5944 0

c  -1-1 --> -2
c    ( b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧  b^{2, 431}_0 ∧ -p_862) -> ( b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0)
c  in CNF:
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨  b^{2, 432}_2
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨  b^{2, 432}_1
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨  p_862 ∨ -b^{2, 432}_0
c  in DIMACS:
-5939  5940 -5941  862  5942 0
-5939  5940 -5941  862  5943 0
-5939  5940 -5941  862 -5944 0

c  -2-1 --> break 
c    ( b^{2, 431}_2 ∧  b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧ -p_862) -> break
c  in CNF:
c    -b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨  b^{2, 431}_0 ∨  p_862 ∨ break
c  in DIMACS:
-5939 -5940  5941  862 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 431}_2 ∧ -b^{2, 431}_1 ∧ -b^{2, 431}_0 ∧ true) 
c  in CNF:
c    -b^{2, 431}_2 ∨  b^{2, 431}_1 ∨  b^{2, 431}_0 ∨ false 
c  in DIMACS:
-5939  5940  5941  0

c  3 does not represent an automaton state.
c    -(-b^{2, 431}_2 ∧  b^{2, 431}_1 ∧  b^{2, 431}_0 ∧ true) 
c  in CNF:
c     b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ false 
c  in DIMACS:
 5939 -5940 -5941  0
c  -3 does not represent an automaton state.
c    -( b^{2, 431}_2 ∧  b^{2, 431}_1 ∧  b^{2, 431}_0 ∧ true) 
c  in CNF:
c    -b^{2, 431}_2 ∨ -b^{2, 431}_1 ∨ -b^{2, 431}_0 ∨ false 
c  in DIMACS:
-5939 -5940 -5941  0

c i = 432
c  -2+1 --> -1
c    ( b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧  p_864) -> ( b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0)
c  in CNF:
c    -b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨  b^{2, 433}_2
c    -b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_1
c    -b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨  b^{2, 433}_0
c  in DIMACS:
-5942 -5943  5944 -864  5945 0
-5942 -5943  5944 -864 -5946 0
-5942 -5943  5944 -864  5947 0

c  -1+1 --> 0
c    ( b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0 ∧  p_864) -> (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧ -b^{2, 433}_0)
c  in CNF:
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_2
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_1
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_0
c  in DIMACS:
-5942  5943 -5944 -864 -5945 0
-5942  5943 -5944 -864 -5946 0
-5942  5943 -5944 -864 -5947 0

c  0+1 --> 1
c    (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧  p_864) -> (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0)
c  in CNF:
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_2
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_1
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨  b^{2, 433}_0
c  in DIMACS:
 5942  5943  5944 -864 -5945 0
 5942  5943  5944 -864 -5946 0
 5942  5943  5944 -864  5947 0

c  1+1 --> 2
c    (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0 ∧  p_864) -> (-b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0)
c  in CNF:
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_2
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨  b^{2, 433}_1
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ -p_864 ∨ -b^{2, 433}_0
c  in DIMACS:
 5942  5943 -5944 -864 -5945 0
 5942  5943 -5944 -864  5946 0
 5942  5943 -5944 -864 -5947 0

c  2+1 --> break 
c    (-b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧  p_864) -> break
c  in CNF:
c     b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 5942 -5943  5944 -864 1162 0


c  2-1 --> 1
c    (-b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧ -p_864) -> (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0)
c  in CNF:
c     b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_2
c     b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_1
c     b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨  b^{2, 433}_0
c  in DIMACS:
 5942 -5943  5944  864 -5945 0
 5942 -5943  5944  864 -5946 0
 5942 -5943  5944  864  5947 0

c  1-1 --> 0
c    (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0 ∧ -p_864) -> (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧ -b^{2, 433}_0)
c  in CNF:
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_2
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_1
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_0
c  in DIMACS:
 5942  5943 -5944  864 -5945 0
 5942  5943 -5944  864 -5946 0
 5942  5943 -5944  864 -5947 0

c  0-1 --> -1
c    (-b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧ -p_864) -> ( b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0)
c  in CNF:
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨  b^{2, 433}_2
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_1
c     b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨  b^{2, 433}_0
c  in DIMACS:
 5942  5943  5944  864  5945 0
 5942  5943  5944  864 -5946 0
 5942  5943  5944  864  5947 0

c  -1-1 --> -2
c    ( b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧  b^{2, 432}_0 ∧ -p_864) -> ( b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0)
c  in CNF:
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨  b^{2, 433}_2
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨  b^{2, 433}_1
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨  p_864 ∨ -b^{2, 433}_0
c  in DIMACS:
-5942  5943 -5944  864  5945 0
-5942  5943 -5944  864  5946 0
-5942  5943 -5944  864 -5947 0

c  -2-1 --> break 
c    ( b^{2, 432}_2 ∧  b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨  b^{2, 432}_0 ∨  p_864 ∨ break
c  in DIMACS:
-5942 -5943  5944  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 432}_2 ∧ -b^{2, 432}_1 ∧ -b^{2, 432}_0 ∧ true) 
c  in CNF:
c    -b^{2, 432}_2 ∨  b^{2, 432}_1 ∨  b^{2, 432}_0 ∨ false 
c  in DIMACS:
-5942  5943  5944  0

c  3 does not represent an automaton state.
c    -(-b^{2, 432}_2 ∧  b^{2, 432}_1 ∧  b^{2, 432}_0 ∧ true) 
c  in CNF:
c     b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ false 
c  in DIMACS:
 5942 -5943 -5944  0
c  -3 does not represent an automaton state.
c    -( b^{2, 432}_2 ∧  b^{2, 432}_1 ∧  b^{2, 432}_0 ∧ true) 
c  in CNF:
c    -b^{2, 432}_2 ∨ -b^{2, 432}_1 ∨ -b^{2, 432}_0 ∨ false 
c  in DIMACS:
-5942 -5943 -5944  0

c i = 433
c  -2+1 --> -1
c    ( b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧  p_866) -> ( b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0)
c  in CNF:
c    -b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨  b^{2, 434}_2
c    -b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_1
c    -b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨  b^{2, 434}_0
c  in DIMACS:
-5945 -5946  5947 -866  5948 0
-5945 -5946  5947 -866 -5949 0
-5945 -5946  5947 -866  5950 0

c  -1+1 --> 0
c    ( b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0 ∧  p_866) -> (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧ -b^{2, 434}_0)
c  in CNF:
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_2
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_1
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_0
c  in DIMACS:
-5945  5946 -5947 -866 -5948 0
-5945  5946 -5947 -866 -5949 0
-5945  5946 -5947 -866 -5950 0

c  0+1 --> 1
c    (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧  p_866) -> (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0)
c  in CNF:
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_2
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_1
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨  b^{2, 434}_0
c  in DIMACS:
 5945  5946  5947 -866 -5948 0
 5945  5946  5947 -866 -5949 0
 5945  5946  5947 -866  5950 0

c  1+1 --> 2
c    (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0 ∧  p_866) -> (-b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0)
c  in CNF:
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_2
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨  b^{2, 434}_1
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ -p_866 ∨ -b^{2, 434}_0
c  in DIMACS:
 5945  5946 -5947 -866 -5948 0
 5945  5946 -5947 -866  5949 0
 5945  5946 -5947 -866 -5950 0

c  2+1 --> break 
c    (-b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧  p_866) -> break
c  in CNF:
c     b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ -p_866 ∨ break
c  in DIMACS:
 5945 -5946  5947 -866 1162 0


c  2-1 --> 1
c    (-b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧ -p_866) -> (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0)
c  in CNF:
c     b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_2
c     b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_1
c     b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨  b^{2, 434}_0
c  in DIMACS:
 5945 -5946  5947  866 -5948 0
 5945 -5946  5947  866 -5949 0
 5945 -5946  5947  866  5950 0

c  1-1 --> 0
c    (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0 ∧ -p_866) -> (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧ -b^{2, 434}_0)
c  in CNF:
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_2
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_1
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_0
c  in DIMACS:
 5945  5946 -5947  866 -5948 0
 5945  5946 -5947  866 -5949 0
 5945  5946 -5947  866 -5950 0

c  0-1 --> -1
c    (-b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧ -p_866) -> ( b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0)
c  in CNF:
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨  b^{2, 434}_2
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_1
c     b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨  b^{2, 434}_0
c  in DIMACS:
 5945  5946  5947  866  5948 0
 5945  5946  5947  866 -5949 0
 5945  5946  5947  866  5950 0

c  -1-1 --> -2
c    ( b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧  b^{2, 433}_0 ∧ -p_866) -> ( b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0)
c  in CNF:
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨  b^{2, 434}_2
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨  b^{2, 434}_1
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨  p_866 ∨ -b^{2, 434}_0
c  in DIMACS:
-5945  5946 -5947  866  5948 0
-5945  5946 -5947  866  5949 0
-5945  5946 -5947  866 -5950 0

c  -2-1 --> break 
c    ( b^{2, 433}_2 ∧  b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧ -p_866) -> break
c  in CNF:
c    -b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨  b^{2, 433}_0 ∨  p_866 ∨ break
c  in DIMACS:
-5945 -5946  5947  866 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 433}_2 ∧ -b^{2, 433}_1 ∧ -b^{2, 433}_0 ∧ true) 
c  in CNF:
c    -b^{2, 433}_2 ∨  b^{2, 433}_1 ∨  b^{2, 433}_0 ∨ false 
c  in DIMACS:
-5945  5946  5947  0

c  3 does not represent an automaton state.
c    -(-b^{2, 433}_2 ∧  b^{2, 433}_1 ∧  b^{2, 433}_0 ∧ true) 
c  in CNF:
c     b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ false 
c  in DIMACS:
 5945 -5946 -5947  0
c  -3 does not represent an automaton state.
c    -( b^{2, 433}_2 ∧  b^{2, 433}_1 ∧  b^{2, 433}_0 ∧ true) 
c  in CNF:
c    -b^{2, 433}_2 ∨ -b^{2, 433}_1 ∨ -b^{2, 433}_0 ∨ false 
c  in DIMACS:
-5945 -5946 -5947  0

c i = 434
c  -2+1 --> -1
c    ( b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧  p_868) -> ( b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0)
c  in CNF:
c    -b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨  b^{2, 435}_2
c    -b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_1
c    -b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨  b^{2, 435}_0
c  in DIMACS:
-5948 -5949  5950 -868  5951 0
-5948 -5949  5950 -868 -5952 0
-5948 -5949  5950 -868  5953 0

c  -1+1 --> 0
c    ( b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0 ∧  p_868) -> (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧ -b^{2, 435}_0)
c  in CNF:
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_2
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_1
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_0
c  in DIMACS:
-5948  5949 -5950 -868 -5951 0
-5948  5949 -5950 -868 -5952 0
-5948  5949 -5950 -868 -5953 0

c  0+1 --> 1
c    (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧  p_868) -> (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0)
c  in CNF:
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_2
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_1
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨  b^{2, 435}_0
c  in DIMACS:
 5948  5949  5950 -868 -5951 0
 5948  5949  5950 -868 -5952 0
 5948  5949  5950 -868  5953 0

c  1+1 --> 2
c    (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0 ∧  p_868) -> (-b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0)
c  in CNF:
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_2
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨  b^{2, 435}_1
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ -p_868 ∨ -b^{2, 435}_0
c  in DIMACS:
 5948  5949 -5950 -868 -5951 0
 5948  5949 -5950 -868  5952 0
 5948  5949 -5950 -868 -5953 0

c  2+1 --> break 
c    (-b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧  p_868) -> break
c  in CNF:
c     b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 5948 -5949  5950 -868 1162 0


c  2-1 --> 1
c    (-b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧ -p_868) -> (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0)
c  in CNF:
c     b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_2
c     b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_1
c     b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨  b^{2, 435}_0
c  in DIMACS:
 5948 -5949  5950  868 -5951 0
 5948 -5949  5950  868 -5952 0
 5948 -5949  5950  868  5953 0

c  1-1 --> 0
c    (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0 ∧ -p_868) -> (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧ -b^{2, 435}_0)
c  in CNF:
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_2
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_1
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_0
c  in DIMACS:
 5948  5949 -5950  868 -5951 0
 5948  5949 -5950  868 -5952 0
 5948  5949 -5950  868 -5953 0

c  0-1 --> -1
c    (-b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧ -p_868) -> ( b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0)
c  in CNF:
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨  b^{2, 435}_2
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_1
c     b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨  b^{2, 435}_0
c  in DIMACS:
 5948  5949  5950  868  5951 0
 5948  5949  5950  868 -5952 0
 5948  5949  5950  868  5953 0

c  -1-1 --> -2
c    ( b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧  b^{2, 434}_0 ∧ -p_868) -> ( b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0)
c  in CNF:
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨  b^{2, 435}_2
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨  b^{2, 435}_1
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨  p_868 ∨ -b^{2, 435}_0
c  in DIMACS:
-5948  5949 -5950  868  5951 0
-5948  5949 -5950  868  5952 0
-5948  5949 -5950  868 -5953 0

c  -2-1 --> break 
c    ( b^{2, 434}_2 ∧  b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨  b^{2, 434}_0 ∨  p_868 ∨ break
c  in DIMACS:
-5948 -5949  5950  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 434}_2 ∧ -b^{2, 434}_1 ∧ -b^{2, 434}_0 ∧ true) 
c  in CNF:
c    -b^{2, 434}_2 ∨  b^{2, 434}_1 ∨  b^{2, 434}_0 ∨ false 
c  in DIMACS:
-5948  5949  5950  0

c  3 does not represent an automaton state.
c    -(-b^{2, 434}_2 ∧  b^{2, 434}_1 ∧  b^{2, 434}_0 ∧ true) 
c  in CNF:
c     b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ false 
c  in DIMACS:
 5948 -5949 -5950  0
c  -3 does not represent an automaton state.
c    -( b^{2, 434}_2 ∧  b^{2, 434}_1 ∧  b^{2, 434}_0 ∧ true) 
c  in CNF:
c    -b^{2, 434}_2 ∨ -b^{2, 434}_1 ∨ -b^{2, 434}_0 ∨ false 
c  in DIMACS:
-5948 -5949 -5950  0

c i = 435
c  -2+1 --> -1
c    ( b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧  p_870) -> ( b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0)
c  in CNF:
c    -b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨  b^{2, 436}_2
c    -b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_1
c    -b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨  b^{2, 436}_0
c  in DIMACS:
-5951 -5952  5953 -870  5954 0
-5951 -5952  5953 -870 -5955 0
-5951 -5952  5953 -870  5956 0

c  -1+1 --> 0
c    ( b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0 ∧  p_870) -> (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧ -b^{2, 436}_0)
c  in CNF:
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_2
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_1
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_0
c  in DIMACS:
-5951  5952 -5953 -870 -5954 0
-5951  5952 -5953 -870 -5955 0
-5951  5952 -5953 -870 -5956 0

c  0+1 --> 1
c    (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧  p_870) -> (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0)
c  in CNF:
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_2
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_1
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨  b^{2, 436}_0
c  in DIMACS:
 5951  5952  5953 -870 -5954 0
 5951  5952  5953 -870 -5955 0
 5951  5952  5953 -870  5956 0

c  1+1 --> 2
c    (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0 ∧  p_870) -> (-b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0)
c  in CNF:
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_2
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨  b^{2, 436}_1
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ -p_870 ∨ -b^{2, 436}_0
c  in DIMACS:
 5951  5952 -5953 -870 -5954 0
 5951  5952 -5953 -870  5955 0
 5951  5952 -5953 -870 -5956 0

c  2+1 --> break 
c    (-b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧  p_870) -> break
c  in CNF:
c     b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 5951 -5952  5953 -870 1162 0


c  2-1 --> 1
c    (-b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧ -p_870) -> (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0)
c  in CNF:
c     b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_2
c     b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_1
c     b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨  b^{2, 436}_0
c  in DIMACS:
 5951 -5952  5953  870 -5954 0
 5951 -5952  5953  870 -5955 0
 5951 -5952  5953  870  5956 0

c  1-1 --> 0
c    (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0 ∧ -p_870) -> (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧ -b^{2, 436}_0)
c  in CNF:
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_2
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_1
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_0
c  in DIMACS:
 5951  5952 -5953  870 -5954 0
 5951  5952 -5953  870 -5955 0
 5951  5952 -5953  870 -5956 0

c  0-1 --> -1
c    (-b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧ -p_870) -> ( b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0)
c  in CNF:
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨  b^{2, 436}_2
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_1
c     b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨  b^{2, 436}_0
c  in DIMACS:
 5951  5952  5953  870  5954 0
 5951  5952  5953  870 -5955 0
 5951  5952  5953  870  5956 0

c  -1-1 --> -2
c    ( b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧  b^{2, 435}_0 ∧ -p_870) -> ( b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0)
c  in CNF:
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨  b^{2, 436}_2
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨  b^{2, 436}_1
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨  p_870 ∨ -b^{2, 436}_0
c  in DIMACS:
-5951  5952 -5953  870  5954 0
-5951  5952 -5953  870  5955 0
-5951  5952 -5953  870 -5956 0

c  -2-1 --> break 
c    ( b^{2, 435}_2 ∧  b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨  b^{2, 435}_0 ∨  p_870 ∨ break
c  in DIMACS:
-5951 -5952  5953  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 435}_2 ∧ -b^{2, 435}_1 ∧ -b^{2, 435}_0 ∧ true) 
c  in CNF:
c    -b^{2, 435}_2 ∨  b^{2, 435}_1 ∨  b^{2, 435}_0 ∨ false 
c  in DIMACS:
-5951  5952  5953  0

c  3 does not represent an automaton state.
c    -(-b^{2, 435}_2 ∧  b^{2, 435}_1 ∧  b^{2, 435}_0 ∧ true) 
c  in CNF:
c     b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ false 
c  in DIMACS:
 5951 -5952 -5953  0
c  -3 does not represent an automaton state.
c    -( b^{2, 435}_2 ∧  b^{2, 435}_1 ∧  b^{2, 435}_0 ∧ true) 
c  in CNF:
c    -b^{2, 435}_2 ∨ -b^{2, 435}_1 ∨ -b^{2, 435}_0 ∨ false 
c  in DIMACS:
-5951 -5952 -5953  0

c i = 436
c  -2+1 --> -1
c    ( b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧  p_872) -> ( b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0)
c  in CNF:
c    -b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨  b^{2, 437}_2
c    -b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_1
c    -b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨  b^{2, 437}_0
c  in DIMACS:
-5954 -5955  5956 -872  5957 0
-5954 -5955  5956 -872 -5958 0
-5954 -5955  5956 -872  5959 0

c  -1+1 --> 0
c    ( b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0 ∧  p_872) -> (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧ -b^{2, 437}_0)
c  in CNF:
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_2
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_1
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_0
c  in DIMACS:
-5954  5955 -5956 -872 -5957 0
-5954  5955 -5956 -872 -5958 0
-5954  5955 -5956 -872 -5959 0

c  0+1 --> 1
c    (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧  p_872) -> (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0)
c  in CNF:
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_2
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_1
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨  b^{2, 437}_0
c  in DIMACS:
 5954  5955  5956 -872 -5957 0
 5954  5955  5956 -872 -5958 0
 5954  5955  5956 -872  5959 0

c  1+1 --> 2
c    (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0 ∧  p_872) -> (-b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0)
c  in CNF:
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_2
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨  b^{2, 437}_1
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ -p_872 ∨ -b^{2, 437}_0
c  in DIMACS:
 5954  5955 -5956 -872 -5957 0
 5954  5955 -5956 -872  5958 0
 5954  5955 -5956 -872 -5959 0

c  2+1 --> break 
c    (-b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧  p_872) -> break
c  in CNF:
c     b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 5954 -5955  5956 -872 1162 0


c  2-1 --> 1
c    (-b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧ -p_872) -> (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0)
c  in CNF:
c     b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_2
c     b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_1
c     b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨  b^{2, 437}_0
c  in DIMACS:
 5954 -5955  5956  872 -5957 0
 5954 -5955  5956  872 -5958 0
 5954 -5955  5956  872  5959 0

c  1-1 --> 0
c    (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0 ∧ -p_872) -> (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧ -b^{2, 437}_0)
c  in CNF:
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_2
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_1
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_0
c  in DIMACS:
 5954  5955 -5956  872 -5957 0
 5954  5955 -5956  872 -5958 0
 5954  5955 -5956  872 -5959 0

c  0-1 --> -1
c    (-b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧ -p_872) -> ( b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0)
c  in CNF:
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨  b^{2, 437}_2
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_1
c     b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨  b^{2, 437}_0
c  in DIMACS:
 5954  5955  5956  872  5957 0
 5954  5955  5956  872 -5958 0
 5954  5955  5956  872  5959 0

c  -1-1 --> -2
c    ( b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧  b^{2, 436}_0 ∧ -p_872) -> ( b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0)
c  in CNF:
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨  b^{2, 437}_2
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨  b^{2, 437}_1
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨  p_872 ∨ -b^{2, 437}_0
c  in DIMACS:
-5954  5955 -5956  872  5957 0
-5954  5955 -5956  872  5958 0
-5954  5955 -5956  872 -5959 0

c  -2-1 --> break 
c    ( b^{2, 436}_2 ∧  b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨  b^{2, 436}_0 ∨  p_872 ∨ break
c  in DIMACS:
-5954 -5955  5956  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 436}_2 ∧ -b^{2, 436}_1 ∧ -b^{2, 436}_0 ∧ true) 
c  in CNF:
c    -b^{2, 436}_2 ∨  b^{2, 436}_1 ∨  b^{2, 436}_0 ∨ false 
c  in DIMACS:
-5954  5955  5956  0

c  3 does not represent an automaton state.
c    -(-b^{2, 436}_2 ∧  b^{2, 436}_1 ∧  b^{2, 436}_0 ∧ true) 
c  in CNF:
c     b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ false 
c  in DIMACS:
 5954 -5955 -5956  0
c  -3 does not represent an automaton state.
c    -( b^{2, 436}_2 ∧  b^{2, 436}_1 ∧  b^{2, 436}_0 ∧ true) 
c  in CNF:
c    -b^{2, 436}_2 ∨ -b^{2, 436}_1 ∨ -b^{2, 436}_0 ∨ false 
c  in DIMACS:
-5954 -5955 -5956  0

c i = 437
c  -2+1 --> -1
c    ( b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧  p_874) -> ( b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0)
c  in CNF:
c    -b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨  b^{2, 438}_2
c    -b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_1
c    -b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨  b^{2, 438}_0
c  in DIMACS:
-5957 -5958  5959 -874  5960 0
-5957 -5958  5959 -874 -5961 0
-5957 -5958  5959 -874  5962 0

c  -1+1 --> 0
c    ( b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0 ∧  p_874) -> (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧ -b^{2, 438}_0)
c  in CNF:
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_2
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_1
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_0
c  in DIMACS:
-5957  5958 -5959 -874 -5960 0
-5957  5958 -5959 -874 -5961 0
-5957  5958 -5959 -874 -5962 0

c  0+1 --> 1
c    (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧  p_874) -> (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0)
c  in CNF:
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_2
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_1
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨  b^{2, 438}_0
c  in DIMACS:
 5957  5958  5959 -874 -5960 0
 5957  5958  5959 -874 -5961 0
 5957  5958  5959 -874  5962 0

c  1+1 --> 2
c    (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0 ∧  p_874) -> (-b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0)
c  in CNF:
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_2
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨  b^{2, 438}_1
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ -p_874 ∨ -b^{2, 438}_0
c  in DIMACS:
 5957  5958 -5959 -874 -5960 0
 5957  5958 -5959 -874  5961 0
 5957  5958 -5959 -874 -5962 0

c  2+1 --> break 
c    (-b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧  p_874) -> break
c  in CNF:
c     b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 5957 -5958  5959 -874 1162 0


c  2-1 --> 1
c    (-b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧ -p_874) -> (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0)
c  in CNF:
c     b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_2
c     b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_1
c     b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨  b^{2, 438}_0
c  in DIMACS:
 5957 -5958  5959  874 -5960 0
 5957 -5958  5959  874 -5961 0
 5957 -5958  5959  874  5962 0

c  1-1 --> 0
c    (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0 ∧ -p_874) -> (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧ -b^{2, 438}_0)
c  in CNF:
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_2
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_1
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_0
c  in DIMACS:
 5957  5958 -5959  874 -5960 0
 5957  5958 -5959  874 -5961 0
 5957  5958 -5959  874 -5962 0

c  0-1 --> -1
c    (-b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧ -p_874) -> ( b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0)
c  in CNF:
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨  b^{2, 438}_2
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_1
c     b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨  b^{2, 438}_0
c  in DIMACS:
 5957  5958  5959  874  5960 0
 5957  5958  5959  874 -5961 0
 5957  5958  5959  874  5962 0

c  -1-1 --> -2
c    ( b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧  b^{2, 437}_0 ∧ -p_874) -> ( b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0)
c  in CNF:
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨  b^{2, 438}_2
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨  b^{2, 438}_1
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨  p_874 ∨ -b^{2, 438}_0
c  in DIMACS:
-5957  5958 -5959  874  5960 0
-5957  5958 -5959  874  5961 0
-5957  5958 -5959  874 -5962 0

c  -2-1 --> break 
c    ( b^{2, 437}_2 ∧  b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨  b^{2, 437}_0 ∨  p_874 ∨ break
c  in DIMACS:
-5957 -5958  5959  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 437}_2 ∧ -b^{2, 437}_1 ∧ -b^{2, 437}_0 ∧ true) 
c  in CNF:
c    -b^{2, 437}_2 ∨  b^{2, 437}_1 ∨  b^{2, 437}_0 ∨ false 
c  in DIMACS:
-5957  5958  5959  0

c  3 does not represent an automaton state.
c    -(-b^{2, 437}_2 ∧  b^{2, 437}_1 ∧  b^{2, 437}_0 ∧ true) 
c  in CNF:
c     b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ false 
c  in DIMACS:
 5957 -5958 -5959  0
c  -3 does not represent an automaton state.
c    -( b^{2, 437}_2 ∧  b^{2, 437}_1 ∧  b^{2, 437}_0 ∧ true) 
c  in CNF:
c    -b^{2, 437}_2 ∨ -b^{2, 437}_1 ∨ -b^{2, 437}_0 ∨ false 
c  in DIMACS:
-5957 -5958 -5959  0

c i = 438
c  -2+1 --> -1
c    ( b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧  p_876) -> ( b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0)
c  in CNF:
c    -b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨  b^{2, 439}_2
c    -b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_1
c    -b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨  b^{2, 439}_0
c  in DIMACS:
-5960 -5961  5962 -876  5963 0
-5960 -5961  5962 -876 -5964 0
-5960 -5961  5962 -876  5965 0

c  -1+1 --> 0
c    ( b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0 ∧  p_876) -> (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧ -b^{2, 439}_0)
c  in CNF:
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_2
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_1
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_0
c  in DIMACS:
-5960  5961 -5962 -876 -5963 0
-5960  5961 -5962 -876 -5964 0
-5960  5961 -5962 -876 -5965 0

c  0+1 --> 1
c    (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧  p_876) -> (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0)
c  in CNF:
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_2
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_1
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨  b^{2, 439}_0
c  in DIMACS:
 5960  5961  5962 -876 -5963 0
 5960  5961  5962 -876 -5964 0
 5960  5961  5962 -876  5965 0

c  1+1 --> 2
c    (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0 ∧  p_876) -> (-b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0)
c  in CNF:
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_2
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨  b^{2, 439}_1
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ -p_876 ∨ -b^{2, 439}_0
c  in DIMACS:
 5960  5961 -5962 -876 -5963 0
 5960  5961 -5962 -876  5964 0
 5960  5961 -5962 -876 -5965 0

c  2+1 --> break 
c    (-b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧  p_876) -> break
c  in CNF:
c     b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 5960 -5961  5962 -876 1162 0


c  2-1 --> 1
c    (-b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧ -p_876) -> (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0)
c  in CNF:
c     b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_2
c     b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_1
c     b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨  b^{2, 439}_0
c  in DIMACS:
 5960 -5961  5962  876 -5963 0
 5960 -5961  5962  876 -5964 0
 5960 -5961  5962  876  5965 0

c  1-1 --> 0
c    (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0 ∧ -p_876) -> (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧ -b^{2, 439}_0)
c  in CNF:
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_2
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_1
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_0
c  in DIMACS:
 5960  5961 -5962  876 -5963 0
 5960  5961 -5962  876 -5964 0
 5960  5961 -5962  876 -5965 0

c  0-1 --> -1
c    (-b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧ -p_876) -> ( b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0)
c  in CNF:
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨  b^{2, 439}_2
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_1
c     b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨  b^{2, 439}_0
c  in DIMACS:
 5960  5961  5962  876  5963 0
 5960  5961  5962  876 -5964 0
 5960  5961  5962  876  5965 0

c  -1-1 --> -2
c    ( b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧  b^{2, 438}_0 ∧ -p_876) -> ( b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0)
c  in CNF:
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨  b^{2, 439}_2
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨  b^{2, 439}_1
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨  p_876 ∨ -b^{2, 439}_0
c  in DIMACS:
-5960  5961 -5962  876  5963 0
-5960  5961 -5962  876  5964 0
-5960  5961 -5962  876 -5965 0

c  -2-1 --> break 
c    ( b^{2, 438}_2 ∧  b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨  b^{2, 438}_0 ∨  p_876 ∨ break
c  in DIMACS:
-5960 -5961  5962  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 438}_2 ∧ -b^{2, 438}_1 ∧ -b^{2, 438}_0 ∧ true) 
c  in CNF:
c    -b^{2, 438}_2 ∨  b^{2, 438}_1 ∨  b^{2, 438}_0 ∨ false 
c  in DIMACS:
-5960  5961  5962  0

c  3 does not represent an automaton state.
c    -(-b^{2, 438}_2 ∧  b^{2, 438}_1 ∧  b^{2, 438}_0 ∧ true) 
c  in CNF:
c     b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ false 
c  in DIMACS:
 5960 -5961 -5962  0
c  -3 does not represent an automaton state.
c    -( b^{2, 438}_2 ∧  b^{2, 438}_1 ∧  b^{2, 438}_0 ∧ true) 
c  in CNF:
c    -b^{2, 438}_2 ∨ -b^{2, 438}_1 ∨ -b^{2, 438}_0 ∨ false 
c  in DIMACS:
-5960 -5961 -5962  0

c i = 439
c  -2+1 --> -1
c    ( b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧  p_878) -> ( b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0)
c  in CNF:
c    -b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨  b^{2, 440}_2
c    -b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_1
c    -b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨  b^{2, 440}_0
c  in DIMACS:
-5963 -5964  5965 -878  5966 0
-5963 -5964  5965 -878 -5967 0
-5963 -5964  5965 -878  5968 0

c  -1+1 --> 0
c    ( b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0 ∧  p_878) -> (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧ -b^{2, 440}_0)
c  in CNF:
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_2
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_1
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_0
c  in DIMACS:
-5963  5964 -5965 -878 -5966 0
-5963  5964 -5965 -878 -5967 0
-5963  5964 -5965 -878 -5968 0

c  0+1 --> 1
c    (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧  p_878) -> (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0)
c  in CNF:
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_2
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_1
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨  b^{2, 440}_0
c  in DIMACS:
 5963  5964  5965 -878 -5966 0
 5963  5964  5965 -878 -5967 0
 5963  5964  5965 -878  5968 0

c  1+1 --> 2
c    (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0 ∧  p_878) -> (-b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0)
c  in CNF:
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_2
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨  b^{2, 440}_1
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ -p_878 ∨ -b^{2, 440}_0
c  in DIMACS:
 5963  5964 -5965 -878 -5966 0
 5963  5964 -5965 -878  5967 0
 5963  5964 -5965 -878 -5968 0

c  2+1 --> break 
c    (-b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧  p_878) -> break
c  in CNF:
c     b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ -p_878 ∨ break
c  in DIMACS:
 5963 -5964  5965 -878 1162 0


c  2-1 --> 1
c    (-b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧ -p_878) -> (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0)
c  in CNF:
c     b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_2
c     b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_1
c     b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨  b^{2, 440}_0
c  in DIMACS:
 5963 -5964  5965  878 -5966 0
 5963 -5964  5965  878 -5967 0
 5963 -5964  5965  878  5968 0

c  1-1 --> 0
c    (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0 ∧ -p_878) -> (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧ -b^{2, 440}_0)
c  in CNF:
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_2
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_1
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_0
c  in DIMACS:
 5963  5964 -5965  878 -5966 0
 5963  5964 -5965  878 -5967 0
 5963  5964 -5965  878 -5968 0

c  0-1 --> -1
c    (-b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧ -p_878) -> ( b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0)
c  in CNF:
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨  b^{2, 440}_2
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_1
c     b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨  b^{2, 440}_0
c  in DIMACS:
 5963  5964  5965  878  5966 0
 5963  5964  5965  878 -5967 0
 5963  5964  5965  878  5968 0

c  -1-1 --> -2
c    ( b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧  b^{2, 439}_0 ∧ -p_878) -> ( b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0)
c  in CNF:
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨  b^{2, 440}_2
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨  b^{2, 440}_1
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨  p_878 ∨ -b^{2, 440}_0
c  in DIMACS:
-5963  5964 -5965  878  5966 0
-5963  5964 -5965  878  5967 0
-5963  5964 -5965  878 -5968 0

c  -2-1 --> break 
c    ( b^{2, 439}_2 ∧  b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧ -p_878) -> break
c  in CNF:
c    -b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨  b^{2, 439}_0 ∨  p_878 ∨ break
c  in DIMACS:
-5963 -5964  5965  878 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 439}_2 ∧ -b^{2, 439}_1 ∧ -b^{2, 439}_0 ∧ true) 
c  in CNF:
c    -b^{2, 439}_2 ∨  b^{2, 439}_1 ∨  b^{2, 439}_0 ∨ false 
c  in DIMACS:
-5963  5964  5965  0

c  3 does not represent an automaton state.
c    -(-b^{2, 439}_2 ∧  b^{2, 439}_1 ∧  b^{2, 439}_0 ∧ true) 
c  in CNF:
c     b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ false 
c  in DIMACS:
 5963 -5964 -5965  0
c  -3 does not represent an automaton state.
c    -( b^{2, 439}_2 ∧  b^{2, 439}_1 ∧  b^{2, 439}_0 ∧ true) 
c  in CNF:
c    -b^{2, 439}_2 ∨ -b^{2, 439}_1 ∨ -b^{2, 439}_0 ∨ false 
c  in DIMACS:
-5963 -5964 -5965  0

c i = 440
c  -2+1 --> -1
c    ( b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧  p_880) -> ( b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0)
c  in CNF:
c    -b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨  b^{2, 441}_2
c    -b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_1
c    -b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨  b^{2, 441}_0
c  in DIMACS:
-5966 -5967  5968 -880  5969 0
-5966 -5967  5968 -880 -5970 0
-5966 -5967  5968 -880  5971 0

c  -1+1 --> 0
c    ( b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0 ∧  p_880) -> (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧ -b^{2, 441}_0)
c  in CNF:
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_2
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_1
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_0
c  in DIMACS:
-5966  5967 -5968 -880 -5969 0
-5966  5967 -5968 -880 -5970 0
-5966  5967 -5968 -880 -5971 0

c  0+1 --> 1
c    (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧  p_880) -> (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0)
c  in CNF:
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_2
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_1
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨  b^{2, 441}_0
c  in DIMACS:
 5966  5967  5968 -880 -5969 0
 5966  5967  5968 -880 -5970 0
 5966  5967  5968 -880  5971 0

c  1+1 --> 2
c    (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0 ∧  p_880) -> (-b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0)
c  in CNF:
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_2
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨  b^{2, 441}_1
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ -p_880 ∨ -b^{2, 441}_0
c  in DIMACS:
 5966  5967 -5968 -880 -5969 0
 5966  5967 -5968 -880  5970 0
 5966  5967 -5968 -880 -5971 0

c  2+1 --> break 
c    (-b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧  p_880) -> break
c  in CNF:
c     b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 5966 -5967  5968 -880 1162 0


c  2-1 --> 1
c    (-b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧ -p_880) -> (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0)
c  in CNF:
c     b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_2
c     b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_1
c     b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨  b^{2, 441}_0
c  in DIMACS:
 5966 -5967  5968  880 -5969 0
 5966 -5967  5968  880 -5970 0
 5966 -5967  5968  880  5971 0

c  1-1 --> 0
c    (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0 ∧ -p_880) -> (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧ -b^{2, 441}_0)
c  in CNF:
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_2
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_1
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_0
c  in DIMACS:
 5966  5967 -5968  880 -5969 0
 5966  5967 -5968  880 -5970 0
 5966  5967 -5968  880 -5971 0

c  0-1 --> -1
c    (-b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧ -p_880) -> ( b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0)
c  in CNF:
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨  b^{2, 441}_2
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_1
c     b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨  b^{2, 441}_0
c  in DIMACS:
 5966  5967  5968  880  5969 0
 5966  5967  5968  880 -5970 0
 5966  5967  5968  880  5971 0

c  -1-1 --> -2
c    ( b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧  b^{2, 440}_0 ∧ -p_880) -> ( b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0)
c  in CNF:
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨  b^{2, 441}_2
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨  b^{2, 441}_1
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨  p_880 ∨ -b^{2, 441}_0
c  in DIMACS:
-5966  5967 -5968  880  5969 0
-5966  5967 -5968  880  5970 0
-5966  5967 -5968  880 -5971 0

c  -2-1 --> break 
c    ( b^{2, 440}_2 ∧  b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨  b^{2, 440}_0 ∨  p_880 ∨ break
c  in DIMACS:
-5966 -5967  5968  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 440}_2 ∧ -b^{2, 440}_1 ∧ -b^{2, 440}_0 ∧ true) 
c  in CNF:
c    -b^{2, 440}_2 ∨  b^{2, 440}_1 ∨  b^{2, 440}_0 ∨ false 
c  in DIMACS:
-5966  5967  5968  0

c  3 does not represent an automaton state.
c    -(-b^{2, 440}_2 ∧  b^{2, 440}_1 ∧  b^{2, 440}_0 ∧ true) 
c  in CNF:
c     b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ false 
c  in DIMACS:
 5966 -5967 -5968  0
c  -3 does not represent an automaton state.
c    -( b^{2, 440}_2 ∧  b^{2, 440}_1 ∧  b^{2, 440}_0 ∧ true) 
c  in CNF:
c    -b^{2, 440}_2 ∨ -b^{2, 440}_1 ∨ -b^{2, 440}_0 ∨ false 
c  in DIMACS:
-5966 -5967 -5968  0

c i = 441
c  -2+1 --> -1
c    ( b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧  p_882) -> ( b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0)
c  in CNF:
c    -b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨  b^{2, 442}_2
c    -b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_1
c    -b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨  b^{2, 442}_0
c  in DIMACS:
-5969 -5970  5971 -882  5972 0
-5969 -5970  5971 -882 -5973 0
-5969 -5970  5971 -882  5974 0

c  -1+1 --> 0
c    ( b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0 ∧  p_882) -> (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧ -b^{2, 442}_0)
c  in CNF:
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_2
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_1
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_0
c  in DIMACS:
-5969  5970 -5971 -882 -5972 0
-5969  5970 -5971 -882 -5973 0
-5969  5970 -5971 -882 -5974 0

c  0+1 --> 1
c    (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧  p_882) -> (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0)
c  in CNF:
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_2
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_1
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨  b^{2, 442}_0
c  in DIMACS:
 5969  5970  5971 -882 -5972 0
 5969  5970  5971 -882 -5973 0
 5969  5970  5971 -882  5974 0

c  1+1 --> 2
c    (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0 ∧  p_882) -> (-b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0)
c  in CNF:
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_2
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨  b^{2, 442}_1
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ -p_882 ∨ -b^{2, 442}_0
c  in DIMACS:
 5969  5970 -5971 -882 -5972 0
 5969  5970 -5971 -882  5973 0
 5969  5970 -5971 -882 -5974 0

c  2+1 --> break 
c    (-b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧  p_882) -> break
c  in CNF:
c     b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 5969 -5970  5971 -882 1162 0


c  2-1 --> 1
c    (-b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧ -p_882) -> (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0)
c  in CNF:
c     b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_2
c     b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_1
c     b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨  b^{2, 442}_0
c  in DIMACS:
 5969 -5970  5971  882 -5972 0
 5969 -5970  5971  882 -5973 0
 5969 -5970  5971  882  5974 0

c  1-1 --> 0
c    (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0 ∧ -p_882) -> (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧ -b^{2, 442}_0)
c  in CNF:
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_2
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_1
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_0
c  in DIMACS:
 5969  5970 -5971  882 -5972 0
 5969  5970 -5971  882 -5973 0
 5969  5970 -5971  882 -5974 0

c  0-1 --> -1
c    (-b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧ -p_882) -> ( b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0)
c  in CNF:
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨  b^{2, 442}_2
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_1
c     b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨  b^{2, 442}_0
c  in DIMACS:
 5969  5970  5971  882  5972 0
 5969  5970  5971  882 -5973 0
 5969  5970  5971  882  5974 0

c  -1-1 --> -2
c    ( b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧  b^{2, 441}_0 ∧ -p_882) -> ( b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0)
c  in CNF:
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨  b^{2, 442}_2
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨  b^{2, 442}_1
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨  p_882 ∨ -b^{2, 442}_0
c  in DIMACS:
-5969  5970 -5971  882  5972 0
-5969  5970 -5971  882  5973 0
-5969  5970 -5971  882 -5974 0

c  -2-1 --> break 
c    ( b^{2, 441}_2 ∧  b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨  b^{2, 441}_0 ∨  p_882 ∨ break
c  in DIMACS:
-5969 -5970  5971  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 441}_2 ∧ -b^{2, 441}_1 ∧ -b^{2, 441}_0 ∧ true) 
c  in CNF:
c    -b^{2, 441}_2 ∨  b^{2, 441}_1 ∨  b^{2, 441}_0 ∨ false 
c  in DIMACS:
-5969  5970  5971  0

c  3 does not represent an automaton state.
c    -(-b^{2, 441}_2 ∧  b^{2, 441}_1 ∧  b^{2, 441}_0 ∧ true) 
c  in CNF:
c     b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ false 
c  in DIMACS:
 5969 -5970 -5971  0
c  -3 does not represent an automaton state.
c    -( b^{2, 441}_2 ∧  b^{2, 441}_1 ∧  b^{2, 441}_0 ∧ true) 
c  in CNF:
c    -b^{2, 441}_2 ∨ -b^{2, 441}_1 ∨ -b^{2, 441}_0 ∨ false 
c  in DIMACS:
-5969 -5970 -5971  0

c i = 442
c  -2+1 --> -1
c    ( b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧  p_884) -> ( b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0)
c  in CNF:
c    -b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨  b^{2, 443}_2
c    -b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_1
c    -b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨  b^{2, 443}_0
c  in DIMACS:
-5972 -5973  5974 -884  5975 0
-5972 -5973  5974 -884 -5976 0
-5972 -5973  5974 -884  5977 0

c  -1+1 --> 0
c    ( b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0 ∧  p_884) -> (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧ -b^{2, 443}_0)
c  in CNF:
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_2
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_1
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_0
c  in DIMACS:
-5972  5973 -5974 -884 -5975 0
-5972  5973 -5974 -884 -5976 0
-5972  5973 -5974 -884 -5977 0

c  0+1 --> 1
c    (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧  p_884) -> (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0)
c  in CNF:
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_2
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_1
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨  b^{2, 443}_0
c  in DIMACS:
 5972  5973  5974 -884 -5975 0
 5972  5973  5974 -884 -5976 0
 5972  5973  5974 -884  5977 0

c  1+1 --> 2
c    (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0 ∧  p_884) -> (-b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0)
c  in CNF:
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_2
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨  b^{2, 443}_1
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ -p_884 ∨ -b^{2, 443}_0
c  in DIMACS:
 5972  5973 -5974 -884 -5975 0
 5972  5973 -5974 -884  5976 0
 5972  5973 -5974 -884 -5977 0

c  2+1 --> break 
c    (-b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧  p_884) -> break
c  in CNF:
c     b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 5972 -5973  5974 -884 1162 0


c  2-1 --> 1
c    (-b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧ -p_884) -> (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0)
c  in CNF:
c     b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_2
c     b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_1
c     b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨  b^{2, 443}_0
c  in DIMACS:
 5972 -5973  5974  884 -5975 0
 5972 -5973  5974  884 -5976 0
 5972 -5973  5974  884  5977 0

c  1-1 --> 0
c    (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0 ∧ -p_884) -> (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧ -b^{2, 443}_0)
c  in CNF:
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_2
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_1
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_0
c  in DIMACS:
 5972  5973 -5974  884 -5975 0
 5972  5973 -5974  884 -5976 0
 5972  5973 -5974  884 -5977 0

c  0-1 --> -1
c    (-b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧ -p_884) -> ( b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0)
c  in CNF:
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨  b^{2, 443}_2
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_1
c     b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨  b^{2, 443}_0
c  in DIMACS:
 5972  5973  5974  884  5975 0
 5972  5973  5974  884 -5976 0
 5972  5973  5974  884  5977 0

c  -1-1 --> -2
c    ( b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧  b^{2, 442}_0 ∧ -p_884) -> ( b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0)
c  in CNF:
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨  b^{2, 443}_2
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨  b^{2, 443}_1
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨  p_884 ∨ -b^{2, 443}_0
c  in DIMACS:
-5972  5973 -5974  884  5975 0
-5972  5973 -5974  884  5976 0
-5972  5973 -5974  884 -5977 0

c  -2-1 --> break 
c    ( b^{2, 442}_2 ∧  b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨  b^{2, 442}_0 ∨  p_884 ∨ break
c  in DIMACS:
-5972 -5973  5974  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 442}_2 ∧ -b^{2, 442}_1 ∧ -b^{2, 442}_0 ∧ true) 
c  in CNF:
c    -b^{2, 442}_2 ∨  b^{2, 442}_1 ∨  b^{2, 442}_0 ∨ false 
c  in DIMACS:
-5972  5973  5974  0

c  3 does not represent an automaton state.
c    -(-b^{2, 442}_2 ∧  b^{2, 442}_1 ∧  b^{2, 442}_0 ∧ true) 
c  in CNF:
c     b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ false 
c  in DIMACS:
 5972 -5973 -5974  0
c  -3 does not represent an automaton state.
c    -( b^{2, 442}_2 ∧  b^{2, 442}_1 ∧  b^{2, 442}_0 ∧ true) 
c  in CNF:
c    -b^{2, 442}_2 ∨ -b^{2, 442}_1 ∨ -b^{2, 442}_0 ∨ false 
c  in DIMACS:
-5972 -5973 -5974  0

c i = 443
c  -2+1 --> -1
c    ( b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧  p_886) -> ( b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0)
c  in CNF:
c    -b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨  b^{2, 444}_2
c    -b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_1
c    -b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨  b^{2, 444}_0
c  in DIMACS:
-5975 -5976  5977 -886  5978 0
-5975 -5976  5977 -886 -5979 0
-5975 -5976  5977 -886  5980 0

c  -1+1 --> 0
c    ( b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0 ∧  p_886) -> (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧ -b^{2, 444}_0)
c  in CNF:
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_2
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_1
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_0
c  in DIMACS:
-5975  5976 -5977 -886 -5978 0
-5975  5976 -5977 -886 -5979 0
-5975  5976 -5977 -886 -5980 0

c  0+1 --> 1
c    (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧  p_886) -> (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0)
c  in CNF:
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_2
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_1
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨  b^{2, 444}_0
c  in DIMACS:
 5975  5976  5977 -886 -5978 0
 5975  5976  5977 -886 -5979 0
 5975  5976  5977 -886  5980 0

c  1+1 --> 2
c    (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0 ∧  p_886) -> (-b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0)
c  in CNF:
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_2
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨  b^{2, 444}_1
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ -p_886 ∨ -b^{2, 444}_0
c  in DIMACS:
 5975  5976 -5977 -886 -5978 0
 5975  5976 -5977 -886  5979 0
 5975  5976 -5977 -886 -5980 0

c  2+1 --> break 
c    (-b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧  p_886) -> break
c  in CNF:
c     b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ -p_886 ∨ break
c  in DIMACS:
 5975 -5976  5977 -886 1162 0


c  2-1 --> 1
c    (-b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧ -p_886) -> (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0)
c  in CNF:
c     b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_2
c     b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_1
c     b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨  b^{2, 444}_0
c  in DIMACS:
 5975 -5976  5977  886 -5978 0
 5975 -5976  5977  886 -5979 0
 5975 -5976  5977  886  5980 0

c  1-1 --> 0
c    (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0 ∧ -p_886) -> (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧ -b^{2, 444}_0)
c  in CNF:
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_2
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_1
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_0
c  in DIMACS:
 5975  5976 -5977  886 -5978 0
 5975  5976 -5977  886 -5979 0
 5975  5976 -5977  886 -5980 0

c  0-1 --> -1
c    (-b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧ -p_886) -> ( b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0)
c  in CNF:
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨  b^{2, 444}_2
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_1
c     b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨  b^{2, 444}_0
c  in DIMACS:
 5975  5976  5977  886  5978 0
 5975  5976  5977  886 -5979 0
 5975  5976  5977  886  5980 0

c  -1-1 --> -2
c    ( b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧  b^{2, 443}_0 ∧ -p_886) -> ( b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0)
c  in CNF:
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨  b^{2, 444}_2
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨  b^{2, 444}_1
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨  p_886 ∨ -b^{2, 444}_0
c  in DIMACS:
-5975  5976 -5977  886  5978 0
-5975  5976 -5977  886  5979 0
-5975  5976 -5977  886 -5980 0

c  -2-1 --> break 
c    ( b^{2, 443}_2 ∧  b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧ -p_886) -> break
c  in CNF:
c    -b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨  b^{2, 443}_0 ∨  p_886 ∨ break
c  in DIMACS:
-5975 -5976  5977  886 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 443}_2 ∧ -b^{2, 443}_1 ∧ -b^{2, 443}_0 ∧ true) 
c  in CNF:
c    -b^{2, 443}_2 ∨  b^{2, 443}_1 ∨  b^{2, 443}_0 ∨ false 
c  in DIMACS:
-5975  5976  5977  0

c  3 does not represent an automaton state.
c    -(-b^{2, 443}_2 ∧  b^{2, 443}_1 ∧  b^{2, 443}_0 ∧ true) 
c  in CNF:
c     b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ false 
c  in DIMACS:
 5975 -5976 -5977  0
c  -3 does not represent an automaton state.
c    -( b^{2, 443}_2 ∧  b^{2, 443}_1 ∧  b^{2, 443}_0 ∧ true) 
c  in CNF:
c    -b^{2, 443}_2 ∨ -b^{2, 443}_1 ∨ -b^{2, 443}_0 ∨ false 
c  in DIMACS:
-5975 -5976 -5977  0

c i = 444
c  -2+1 --> -1
c    ( b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧  p_888) -> ( b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0)
c  in CNF:
c    -b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨  b^{2, 445}_2
c    -b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_1
c    -b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨  b^{2, 445}_0
c  in DIMACS:
-5978 -5979  5980 -888  5981 0
-5978 -5979  5980 -888 -5982 0
-5978 -5979  5980 -888  5983 0

c  -1+1 --> 0
c    ( b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0 ∧  p_888) -> (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧ -b^{2, 445}_0)
c  in CNF:
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_2
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_1
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_0
c  in DIMACS:
-5978  5979 -5980 -888 -5981 0
-5978  5979 -5980 -888 -5982 0
-5978  5979 -5980 -888 -5983 0

c  0+1 --> 1
c    (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧  p_888) -> (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0)
c  in CNF:
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_2
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_1
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨  b^{2, 445}_0
c  in DIMACS:
 5978  5979  5980 -888 -5981 0
 5978  5979  5980 -888 -5982 0
 5978  5979  5980 -888  5983 0

c  1+1 --> 2
c    (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0 ∧  p_888) -> (-b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0)
c  in CNF:
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_2
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨  b^{2, 445}_1
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ -p_888 ∨ -b^{2, 445}_0
c  in DIMACS:
 5978  5979 -5980 -888 -5981 0
 5978  5979 -5980 -888  5982 0
 5978  5979 -5980 -888 -5983 0

c  2+1 --> break 
c    (-b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧  p_888) -> break
c  in CNF:
c     b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 5978 -5979  5980 -888 1162 0


c  2-1 --> 1
c    (-b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧ -p_888) -> (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0)
c  in CNF:
c     b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_2
c     b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_1
c     b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨  b^{2, 445}_0
c  in DIMACS:
 5978 -5979  5980  888 -5981 0
 5978 -5979  5980  888 -5982 0
 5978 -5979  5980  888  5983 0

c  1-1 --> 0
c    (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0 ∧ -p_888) -> (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧ -b^{2, 445}_0)
c  in CNF:
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_2
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_1
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_0
c  in DIMACS:
 5978  5979 -5980  888 -5981 0
 5978  5979 -5980  888 -5982 0
 5978  5979 -5980  888 -5983 0

c  0-1 --> -1
c    (-b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧ -p_888) -> ( b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0)
c  in CNF:
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨  b^{2, 445}_2
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_1
c     b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨  b^{2, 445}_0
c  in DIMACS:
 5978  5979  5980  888  5981 0
 5978  5979  5980  888 -5982 0
 5978  5979  5980  888  5983 0

c  -1-1 --> -2
c    ( b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧  b^{2, 444}_0 ∧ -p_888) -> ( b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0)
c  in CNF:
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨  b^{2, 445}_2
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨  b^{2, 445}_1
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨  p_888 ∨ -b^{2, 445}_0
c  in DIMACS:
-5978  5979 -5980  888  5981 0
-5978  5979 -5980  888  5982 0
-5978  5979 -5980  888 -5983 0

c  -2-1 --> break 
c    ( b^{2, 444}_2 ∧  b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨  b^{2, 444}_0 ∨  p_888 ∨ break
c  in DIMACS:
-5978 -5979  5980  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 444}_2 ∧ -b^{2, 444}_1 ∧ -b^{2, 444}_0 ∧ true) 
c  in CNF:
c    -b^{2, 444}_2 ∨  b^{2, 444}_1 ∨  b^{2, 444}_0 ∨ false 
c  in DIMACS:
-5978  5979  5980  0

c  3 does not represent an automaton state.
c    -(-b^{2, 444}_2 ∧  b^{2, 444}_1 ∧  b^{2, 444}_0 ∧ true) 
c  in CNF:
c     b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ false 
c  in DIMACS:
 5978 -5979 -5980  0
c  -3 does not represent an automaton state.
c    -( b^{2, 444}_2 ∧  b^{2, 444}_1 ∧  b^{2, 444}_0 ∧ true) 
c  in CNF:
c    -b^{2, 444}_2 ∨ -b^{2, 444}_1 ∨ -b^{2, 444}_0 ∨ false 
c  in DIMACS:
-5978 -5979 -5980  0

c i = 445
c  -2+1 --> -1
c    ( b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧  p_890) -> ( b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0)
c  in CNF:
c    -b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨  b^{2, 446}_2
c    -b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_1
c    -b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨  b^{2, 446}_0
c  in DIMACS:
-5981 -5982  5983 -890  5984 0
-5981 -5982  5983 -890 -5985 0
-5981 -5982  5983 -890  5986 0

c  -1+1 --> 0
c    ( b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0 ∧  p_890) -> (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧ -b^{2, 446}_0)
c  in CNF:
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_2
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_1
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_0
c  in DIMACS:
-5981  5982 -5983 -890 -5984 0
-5981  5982 -5983 -890 -5985 0
-5981  5982 -5983 -890 -5986 0

c  0+1 --> 1
c    (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧  p_890) -> (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0)
c  in CNF:
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_2
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_1
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨  b^{2, 446}_0
c  in DIMACS:
 5981  5982  5983 -890 -5984 0
 5981  5982  5983 -890 -5985 0
 5981  5982  5983 -890  5986 0

c  1+1 --> 2
c    (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0 ∧  p_890) -> (-b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0)
c  in CNF:
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_2
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨  b^{2, 446}_1
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ -p_890 ∨ -b^{2, 446}_0
c  in DIMACS:
 5981  5982 -5983 -890 -5984 0
 5981  5982 -5983 -890  5985 0
 5981  5982 -5983 -890 -5986 0

c  2+1 --> break 
c    (-b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧  p_890) -> break
c  in CNF:
c     b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 5981 -5982  5983 -890 1162 0


c  2-1 --> 1
c    (-b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧ -p_890) -> (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0)
c  in CNF:
c     b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_2
c     b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_1
c     b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨  b^{2, 446}_0
c  in DIMACS:
 5981 -5982  5983  890 -5984 0
 5981 -5982  5983  890 -5985 0
 5981 -5982  5983  890  5986 0

c  1-1 --> 0
c    (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0 ∧ -p_890) -> (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧ -b^{2, 446}_0)
c  in CNF:
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_2
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_1
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_0
c  in DIMACS:
 5981  5982 -5983  890 -5984 0
 5981  5982 -5983  890 -5985 0
 5981  5982 -5983  890 -5986 0

c  0-1 --> -1
c    (-b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧ -p_890) -> ( b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0)
c  in CNF:
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨  b^{2, 446}_2
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_1
c     b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨  b^{2, 446}_0
c  in DIMACS:
 5981  5982  5983  890  5984 0
 5981  5982  5983  890 -5985 0
 5981  5982  5983  890  5986 0

c  -1-1 --> -2
c    ( b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧  b^{2, 445}_0 ∧ -p_890) -> ( b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0)
c  in CNF:
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨  b^{2, 446}_2
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨  b^{2, 446}_1
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨  p_890 ∨ -b^{2, 446}_0
c  in DIMACS:
-5981  5982 -5983  890  5984 0
-5981  5982 -5983  890  5985 0
-5981  5982 -5983  890 -5986 0

c  -2-1 --> break 
c    ( b^{2, 445}_2 ∧  b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨  b^{2, 445}_0 ∨  p_890 ∨ break
c  in DIMACS:
-5981 -5982  5983  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 445}_2 ∧ -b^{2, 445}_1 ∧ -b^{2, 445}_0 ∧ true) 
c  in CNF:
c    -b^{2, 445}_2 ∨  b^{2, 445}_1 ∨  b^{2, 445}_0 ∨ false 
c  in DIMACS:
-5981  5982  5983  0

c  3 does not represent an automaton state.
c    -(-b^{2, 445}_2 ∧  b^{2, 445}_1 ∧  b^{2, 445}_0 ∧ true) 
c  in CNF:
c     b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ false 
c  in DIMACS:
 5981 -5982 -5983  0
c  -3 does not represent an automaton state.
c    -( b^{2, 445}_2 ∧  b^{2, 445}_1 ∧  b^{2, 445}_0 ∧ true) 
c  in CNF:
c    -b^{2, 445}_2 ∨ -b^{2, 445}_1 ∨ -b^{2, 445}_0 ∨ false 
c  in DIMACS:
-5981 -5982 -5983  0

c i = 446
c  -2+1 --> -1
c    ( b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧  p_892) -> ( b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0)
c  in CNF:
c    -b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨  b^{2, 447}_2
c    -b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_1
c    -b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨  b^{2, 447}_0
c  in DIMACS:
-5984 -5985  5986 -892  5987 0
-5984 -5985  5986 -892 -5988 0
-5984 -5985  5986 -892  5989 0

c  -1+1 --> 0
c    ( b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0 ∧  p_892) -> (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧ -b^{2, 447}_0)
c  in CNF:
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_2
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_1
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_0
c  in DIMACS:
-5984  5985 -5986 -892 -5987 0
-5984  5985 -5986 -892 -5988 0
-5984  5985 -5986 -892 -5989 0

c  0+1 --> 1
c    (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧  p_892) -> (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0)
c  in CNF:
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_2
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_1
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨  b^{2, 447}_0
c  in DIMACS:
 5984  5985  5986 -892 -5987 0
 5984  5985  5986 -892 -5988 0
 5984  5985  5986 -892  5989 0

c  1+1 --> 2
c    (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0 ∧  p_892) -> (-b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0)
c  in CNF:
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_2
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨  b^{2, 447}_1
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ -p_892 ∨ -b^{2, 447}_0
c  in DIMACS:
 5984  5985 -5986 -892 -5987 0
 5984  5985 -5986 -892  5988 0
 5984  5985 -5986 -892 -5989 0

c  2+1 --> break 
c    (-b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧  p_892) -> break
c  in CNF:
c     b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ -p_892 ∨ break
c  in DIMACS:
 5984 -5985  5986 -892 1162 0


c  2-1 --> 1
c    (-b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧ -p_892) -> (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0)
c  in CNF:
c     b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_2
c     b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_1
c     b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨  b^{2, 447}_0
c  in DIMACS:
 5984 -5985  5986  892 -5987 0
 5984 -5985  5986  892 -5988 0
 5984 -5985  5986  892  5989 0

c  1-1 --> 0
c    (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0 ∧ -p_892) -> (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧ -b^{2, 447}_0)
c  in CNF:
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_2
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_1
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_0
c  in DIMACS:
 5984  5985 -5986  892 -5987 0
 5984  5985 -5986  892 -5988 0
 5984  5985 -5986  892 -5989 0

c  0-1 --> -1
c    (-b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧ -p_892) -> ( b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0)
c  in CNF:
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨  b^{2, 447}_2
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_1
c     b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨  b^{2, 447}_0
c  in DIMACS:
 5984  5985  5986  892  5987 0
 5984  5985  5986  892 -5988 0
 5984  5985  5986  892  5989 0

c  -1-1 --> -2
c    ( b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧  b^{2, 446}_0 ∧ -p_892) -> ( b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0)
c  in CNF:
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨  b^{2, 447}_2
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨  b^{2, 447}_1
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨  p_892 ∨ -b^{2, 447}_0
c  in DIMACS:
-5984  5985 -5986  892  5987 0
-5984  5985 -5986  892  5988 0
-5984  5985 -5986  892 -5989 0

c  -2-1 --> break 
c    ( b^{2, 446}_2 ∧  b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧ -p_892) -> break
c  in CNF:
c    -b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨  b^{2, 446}_0 ∨  p_892 ∨ break
c  in DIMACS:
-5984 -5985  5986  892 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 446}_2 ∧ -b^{2, 446}_1 ∧ -b^{2, 446}_0 ∧ true) 
c  in CNF:
c    -b^{2, 446}_2 ∨  b^{2, 446}_1 ∨  b^{2, 446}_0 ∨ false 
c  in DIMACS:
-5984  5985  5986  0

c  3 does not represent an automaton state.
c    -(-b^{2, 446}_2 ∧  b^{2, 446}_1 ∧  b^{2, 446}_0 ∧ true) 
c  in CNF:
c     b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ false 
c  in DIMACS:
 5984 -5985 -5986  0
c  -3 does not represent an automaton state.
c    -( b^{2, 446}_2 ∧  b^{2, 446}_1 ∧  b^{2, 446}_0 ∧ true) 
c  in CNF:
c    -b^{2, 446}_2 ∨ -b^{2, 446}_1 ∨ -b^{2, 446}_0 ∨ false 
c  in DIMACS:
-5984 -5985 -5986  0

c i = 447
c  -2+1 --> -1
c    ( b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧  p_894) -> ( b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0)
c  in CNF:
c    -b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨  b^{2, 448}_2
c    -b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_1
c    -b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨  b^{2, 448}_0
c  in DIMACS:
-5987 -5988  5989 -894  5990 0
-5987 -5988  5989 -894 -5991 0
-5987 -5988  5989 -894  5992 0

c  -1+1 --> 0
c    ( b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0 ∧  p_894) -> (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧ -b^{2, 448}_0)
c  in CNF:
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_2
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_1
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_0
c  in DIMACS:
-5987  5988 -5989 -894 -5990 0
-5987  5988 -5989 -894 -5991 0
-5987  5988 -5989 -894 -5992 0

c  0+1 --> 1
c    (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧  p_894) -> (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0)
c  in CNF:
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_2
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_1
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨  b^{2, 448}_0
c  in DIMACS:
 5987  5988  5989 -894 -5990 0
 5987  5988  5989 -894 -5991 0
 5987  5988  5989 -894  5992 0

c  1+1 --> 2
c    (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0 ∧  p_894) -> (-b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0)
c  in CNF:
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_2
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨  b^{2, 448}_1
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ -p_894 ∨ -b^{2, 448}_0
c  in DIMACS:
 5987  5988 -5989 -894 -5990 0
 5987  5988 -5989 -894  5991 0
 5987  5988 -5989 -894 -5992 0

c  2+1 --> break 
c    (-b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧  p_894) -> break
c  in CNF:
c     b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 5987 -5988  5989 -894 1162 0


c  2-1 --> 1
c    (-b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧ -p_894) -> (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0)
c  in CNF:
c     b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_2
c     b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_1
c     b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨  b^{2, 448}_0
c  in DIMACS:
 5987 -5988  5989  894 -5990 0
 5987 -5988  5989  894 -5991 0
 5987 -5988  5989  894  5992 0

c  1-1 --> 0
c    (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0 ∧ -p_894) -> (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧ -b^{2, 448}_0)
c  in CNF:
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_2
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_1
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_0
c  in DIMACS:
 5987  5988 -5989  894 -5990 0
 5987  5988 -5989  894 -5991 0
 5987  5988 -5989  894 -5992 0

c  0-1 --> -1
c    (-b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧ -p_894) -> ( b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0)
c  in CNF:
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨  b^{2, 448}_2
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_1
c     b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨  b^{2, 448}_0
c  in DIMACS:
 5987  5988  5989  894  5990 0
 5987  5988  5989  894 -5991 0
 5987  5988  5989  894  5992 0

c  -1-1 --> -2
c    ( b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧  b^{2, 447}_0 ∧ -p_894) -> ( b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0)
c  in CNF:
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨  b^{2, 448}_2
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨  b^{2, 448}_1
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨  p_894 ∨ -b^{2, 448}_0
c  in DIMACS:
-5987  5988 -5989  894  5990 0
-5987  5988 -5989  894  5991 0
-5987  5988 -5989  894 -5992 0

c  -2-1 --> break 
c    ( b^{2, 447}_2 ∧  b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨  b^{2, 447}_0 ∨  p_894 ∨ break
c  in DIMACS:
-5987 -5988  5989  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 447}_2 ∧ -b^{2, 447}_1 ∧ -b^{2, 447}_0 ∧ true) 
c  in CNF:
c    -b^{2, 447}_2 ∨  b^{2, 447}_1 ∨  b^{2, 447}_0 ∨ false 
c  in DIMACS:
-5987  5988  5989  0

c  3 does not represent an automaton state.
c    -(-b^{2, 447}_2 ∧  b^{2, 447}_1 ∧  b^{2, 447}_0 ∧ true) 
c  in CNF:
c     b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ false 
c  in DIMACS:
 5987 -5988 -5989  0
c  -3 does not represent an automaton state.
c    -( b^{2, 447}_2 ∧  b^{2, 447}_1 ∧  b^{2, 447}_0 ∧ true) 
c  in CNF:
c    -b^{2, 447}_2 ∨ -b^{2, 447}_1 ∨ -b^{2, 447}_0 ∨ false 
c  in DIMACS:
-5987 -5988 -5989  0

c i = 448
c  -2+1 --> -1
c    ( b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧  p_896) -> ( b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0)
c  in CNF:
c    -b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨  b^{2, 449}_2
c    -b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_1
c    -b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨  b^{2, 449}_0
c  in DIMACS:
-5990 -5991  5992 -896  5993 0
-5990 -5991  5992 -896 -5994 0
-5990 -5991  5992 -896  5995 0

c  -1+1 --> 0
c    ( b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0 ∧  p_896) -> (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧ -b^{2, 449}_0)
c  in CNF:
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_2
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_1
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_0
c  in DIMACS:
-5990  5991 -5992 -896 -5993 0
-5990  5991 -5992 -896 -5994 0
-5990  5991 -5992 -896 -5995 0

c  0+1 --> 1
c    (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧  p_896) -> (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0)
c  in CNF:
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_2
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_1
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨  b^{2, 449}_0
c  in DIMACS:
 5990  5991  5992 -896 -5993 0
 5990  5991  5992 -896 -5994 0
 5990  5991  5992 -896  5995 0

c  1+1 --> 2
c    (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0 ∧  p_896) -> (-b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0)
c  in CNF:
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_2
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨  b^{2, 449}_1
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ -p_896 ∨ -b^{2, 449}_0
c  in DIMACS:
 5990  5991 -5992 -896 -5993 0
 5990  5991 -5992 -896  5994 0
 5990  5991 -5992 -896 -5995 0

c  2+1 --> break 
c    (-b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧  p_896) -> break
c  in CNF:
c     b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 5990 -5991  5992 -896 1162 0


c  2-1 --> 1
c    (-b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧ -p_896) -> (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0)
c  in CNF:
c     b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_2
c     b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_1
c     b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨  b^{2, 449}_0
c  in DIMACS:
 5990 -5991  5992  896 -5993 0
 5990 -5991  5992  896 -5994 0
 5990 -5991  5992  896  5995 0

c  1-1 --> 0
c    (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0 ∧ -p_896) -> (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧ -b^{2, 449}_0)
c  in CNF:
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_2
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_1
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_0
c  in DIMACS:
 5990  5991 -5992  896 -5993 0
 5990  5991 -5992  896 -5994 0
 5990  5991 -5992  896 -5995 0

c  0-1 --> -1
c    (-b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧ -p_896) -> ( b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0)
c  in CNF:
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨  b^{2, 449}_2
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_1
c     b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨  b^{2, 449}_0
c  in DIMACS:
 5990  5991  5992  896  5993 0
 5990  5991  5992  896 -5994 0
 5990  5991  5992  896  5995 0

c  -1-1 --> -2
c    ( b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧  b^{2, 448}_0 ∧ -p_896) -> ( b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0)
c  in CNF:
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨  b^{2, 449}_2
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨  b^{2, 449}_1
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨  p_896 ∨ -b^{2, 449}_0
c  in DIMACS:
-5990  5991 -5992  896  5993 0
-5990  5991 -5992  896  5994 0
-5990  5991 -5992  896 -5995 0

c  -2-1 --> break 
c    ( b^{2, 448}_2 ∧  b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨  b^{2, 448}_0 ∨  p_896 ∨ break
c  in DIMACS:
-5990 -5991  5992  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 448}_2 ∧ -b^{2, 448}_1 ∧ -b^{2, 448}_0 ∧ true) 
c  in CNF:
c    -b^{2, 448}_2 ∨  b^{2, 448}_1 ∨  b^{2, 448}_0 ∨ false 
c  in DIMACS:
-5990  5991  5992  0

c  3 does not represent an automaton state.
c    -(-b^{2, 448}_2 ∧  b^{2, 448}_1 ∧  b^{2, 448}_0 ∧ true) 
c  in CNF:
c     b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ false 
c  in DIMACS:
 5990 -5991 -5992  0
c  -3 does not represent an automaton state.
c    -( b^{2, 448}_2 ∧  b^{2, 448}_1 ∧  b^{2, 448}_0 ∧ true) 
c  in CNF:
c    -b^{2, 448}_2 ∨ -b^{2, 448}_1 ∨ -b^{2, 448}_0 ∨ false 
c  in DIMACS:
-5990 -5991 -5992  0

c i = 449
c  -2+1 --> -1
c    ( b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧  p_898) -> ( b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0)
c  in CNF:
c    -b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨  b^{2, 450}_2
c    -b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_1
c    -b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨  b^{2, 450}_0
c  in DIMACS:
-5993 -5994  5995 -898  5996 0
-5993 -5994  5995 -898 -5997 0
-5993 -5994  5995 -898  5998 0

c  -1+1 --> 0
c    ( b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0 ∧  p_898) -> (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧ -b^{2, 450}_0)
c  in CNF:
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_2
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_1
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_0
c  in DIMACS:
-5993  5994 -5995 -898 -5996 0
-5993  5994 -5995 -898 -5997 0
-5993  5994 -5995 -898 -5998 0

c  0+1 --> 1
c    (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧  p_898) -> (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0)
c  in CNF:
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_2
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_1
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨  b^{2, 450}_0
c  in DIMACS:
 5993  5994  5995 -898 -5996 0
 5993  5994  5995 -898 -5997 0
 5993  5994  5995 -898  5998 0

c  1+1 --> 2
c    (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0 ∧  p_898) -> (-b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0)
c  in CNF:
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_2
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨  b^{2, 450}_1
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ -p_898 ∨ -b^{2, 450}_0
c  in DIMACS:
 5993  5994 -5995 -898 -5996 0
 5993  5994 -5995 -898  5997 0
 5993  5994 -5995 -898 -5998 0

c  2+1 --> break 
c    (-b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧  p_898) -> break
c  in CNF:
c     b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ -p_898 ∨ break
c  in DIMACS:
 5993 -5994  5995 -898 1162 0


c  2-1 --> 1
c    (-b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧ -p_898) -> (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0)
c  in CNF:
c     b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_2
c     b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_1
c     b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨  b^{2, 450}_0
c  in DIMACS:
 5993 -5994  5995  898 -5996 0
 5993 -5994  5995  898 -5997 0
 5993 -5994  5995  898  5998 0

c  1-1 --> 0
c    (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0 ∧ -p_898) -> (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧ -b^{2, 450}_0)
c  in CNF:
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_2
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_1
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_0
c  in DIMACS:
 5993  5994 -5995  898 -5996 0
 5993  5994 -5995  898 -5997 0
 5993  5994 -5995  898 -5998 0

c  0-1 --> -1
c    (-b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧ -p_898) -> ( b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0)
c  in CNF:
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨  b^{2, 450}_2
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_1
c     b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨  b^{2, 450}_0
c  in DIMACS:
 5993  5994  5995  898  5996 0
 5993  5994  5995  898 -5997 0
 5993  5994  5995  898  5998 0

c  -1-1 --> -2
c    ( b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧  b^{2, 449}_0 ∧ -p_898) -> ( b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0)
c  in CNF:
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨  b^{2, 450}_2
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨  b^{2, 450}_1
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨  p_898 ∨ -b^{2, 450}_0
c  in DIMACS:
-5993  5994 -5995  898  5996 0
-5993  5994 -5995  898  5997 0
-5993  5994 -5995  898 -5998 0

c  -2-1 --> break 
c    ( b^{2, 449}_2 ∧  b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧ -p_898) -> break
c  in CNF:
c    -b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨  b^{2, 449}_0 ∨  p_898 ∨ break
c  in DIMACS:
-5993 -5994  5995  898 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 449}_2 ∧ -b^{2, 449}_1 ∧ -b^{2, 449}_0 ∧ true) 
c  in CNF:
c    -b^{2, 449}_2 ∨  b^{2, 449}_1 ∨  b^{2, 449}_0 ∨ false 
c  in DIMACS:
-5993  5994  5995  0

c  3 does not represent an automaton state.
c    -(-b^{2, 449}_2 ∧  b^{2, 449}_1 ∧  b^{2, 449}_0 ∧ true) 
c  in CNF:
c     b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ false 
c  in DIMACS:
 5993 -5994 -5995  0
c  -3 does not represent an automaton state.
c    -( b^{2, 449}_2 ∧  b^{2, 449}_1 ∧  b^{2, 449}_0 ∧ true) 
c  in CNF:
c    -b^{2, 449}_2 ∨ -b^{2, 449}_1 ∨ -b^{2, 449}_0 ∨ false 
c  in DIMACS:
-5993 -5994 -5995  0

c i = 450
c  -2+1 --> -1
c    ( b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧  p_900) -> ( b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0)
c  in CNF:
c    -b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨  b^{2, 451}_2
c    -b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_1
c    -b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨  b^{2, 451}_0
c  in DIMACS:
-5996 -5997  5998 -900  5999 0
-5996 -5997  5998 -900 -6000 0
-5996 -5997  5998 -900  6001 0

c  -1+1 --> 0
c    ( b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0 ∧  p_900) -> (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧ -b^{2, 451}_0)
c  in CNF:
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_2
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_1
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_0
c  in DIMACS:
-5996  5997 -5998 -900 -5999 0
-5996  5997 -5998 -900 -6000 0
-5996  5997 -5998 -900 -6001 0

c  0+1 --> 1
c    (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧  p_900) -> (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0)
c  in CNF:
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_2
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_1
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨  b^{2, 451}_0
c  in DIMACS:
 5996  5997  5998 -900 -5999 0
 5996  5997  5998 -900 -6000 0
 5996  5997  5998 -900  6001 0

c  1+1 --> 2
c    (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0 ∧  p_900) -> (-b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0)
c  in CNF:
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_2
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨  b^{2, 451}_1
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ -p_900 ∨ -b^{2, 451}_0
c  in DIMACS:
 5996  5997 -5998 -900 -5999 0
 5996  5997 -5998 -900  6000 0
 5996  5997 -5998 -900 -6001 0

c  2+1 --> break 
c    (-b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧  p_900) -> break
c  in CNF:
c     b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 5996 -5997  5998 -900 1162 0


c  2-1 --> 1
c    (-b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧ -p_900) -> (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0)
c  in CNF:
c     b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_2
c     b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_1
c     b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨  b^{2, 451}_0
c  in DIMACS:
 5996 -5997  5998  900 -5999 0
 5996 -5997  5998  900 -6000 0
 5996 -5997  5998  900  6001 0

c  1-1 --> 0
c    (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0 ∧ -p_900) -> (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧ -b^{2, 451}_0)
c  in CNF:
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_2
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_1
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_0
c  in DIMACS:
 5996  5997 -5998  900 -5999 0
 5996  5997 -5998  900 -6000 0
 5996  5997 -5998  900 -6001 0

c  0-1 --> -1
c    (-b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧ -p_900) -> ( b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0)
c  in CNF:
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨  b^{2, 451}_2
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_1
c     b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨  b^{2, 451}_0
c  in DIMACS:
 5996  5997  5998  900  5999 0
 5996  5997  5998  900 -6000 0
 5996  5997  5998  900  6001 0

c  -1-1 --> -2
c    ( b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧  b^{2, 450}_0 ∧ -p_900) -> ( b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0)
c  in CNF:
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨  b^{2, 451}_2
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨  b^{2, 451}_1
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨  p_900 ∨ -b^{2, 451}_0
c  in DIMACS:
-5996  5997 -5998  900  5999 0
-5996  5997 -5998  900  6000 0
-5996  5997 -5998  900 -6001 0

c  -2-1 --> break 
c    ( b^{2, 450}_2 ∧  b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨  b^{2, 450}_0 ∨  p_900 ∨ break
c  in DIMACS:
-5996 -5997  5998  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 450}_2 ∧ -b^{2, 450}_1 ∧ -b^{2, 450}_0 ∧ true) 
c  in CNF:
c    -b^{2, 450}_2 ∨  b^{2, 450}_1 ∨  b^{2, 450}_0 ∨ false 
c  in DIMACS:
-5996  5997  5998  0

c  3 does not represent an automaton state.
c    -(-b^{2, 450}_2 ∧  b^{2, 450}_1 ∧  b^{2, 450}_0 ∧ true) 
c  in CNF:
c     b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ false 
c  in DIMACS:
 5996 -5997 -5998  0
c  -3 does not represent an automaton state.
c    -( b^{2, 450}_2 ∧  b^{2, 450}_1 ∧  b^{2, 450}_0 ∧ true) 
c  in CNF:
c    -b^{2, 450}_2 ∨ -b^{2, 450}_1 ∨ -b^{2, 450}_0 ∨ false 
c  in DIMACS:
-5996 -5997 -5998  0

c i = 451
c  -2+1 --> -1
c    ( b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧  p_902) -> ( b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0)
c  in CNF:
c    -b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨  b^{2, 452}_2
c    -b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_1
c    -b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨  b^{2, 452}_0
c  in DIMACS:
-5999 -6000  6001 -902  6002 0
-5999 -6000  6001 -902 -6003 0
-5999 -6000  6001 -902  6004 0

c  -1+1 --> 0
c    ( b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0 ∧  p_902) -> (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧ -b^{2, 452}_0)
c  in CNF:
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_2
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_1
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_0
c  in DIMACS:
-5999  6000 -6001 -902 -6002 0
-5999  6000 -6001 -902 -6003 0
-5999  6000 -6001 -902 -6004 0

c  0+1 --> 1
c    (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧  p_902) -> (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0)
c  in CNF:
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_2
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_1
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨  b^{2, 452}_0
c  in DIMACS:
 5999  6000  6001 -902 -6002 0
 5999  6000  6001 -902 -6003 0
 5999  6000  6001 -902  6004 0

c  1+1 --> 2
c    (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0 ∧  p_902) -> (-b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0)
c  in CNF:
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_2
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨  b^{2, 452}_1
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ -p_902 ∨ -b^{2, 452}_0
c  in DIMACS:
 5999  6000 -6001 -902 -6002 0
 5999  6000 -6001 -902  6003 0
 5999  6000 -6001 -902 -6004 0

c  2+1 --> break 
c    (-b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧  p_902) -> break
c  in CNF:
c     b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 5999 -6000  6001 -902 1162 0


c  2-1 --> 1
c    (-b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧ -p_902) -> (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0)
c  in CNF:
c     b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_2
c     b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_1
c     b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨  b^{2, 452}_0
c  in DIMACS:
 5999 -6000  6001  902 -6002 0
 5999 -6000  6001  902 -6003 0
 5999 -6000  6001  902  6004 0

c  1-1 --> 0
c    (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0 ∧ -p_902) -> (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧ -b^{2, 452}_0)
c  in CNF:
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_2
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_1
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_0
c  in DIMACS:
 5999  6000 -6001  902 -6002 0
 5999  6000 -6001  902 -6003 0
 5999  6000 -6001  902 -6004 0

c  0-1 --> -1
c    (-b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧ -p_902) -> ( b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0)
c  in CNF:
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨  b^{2, 452}_2
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_1
c     b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨  b^{2, 452}_0
c  in DIMACS:
 5999  6000  6001  902  6002 0
 5999  6000  6001  902 -6003 0
 5999  6000  6001  902  6004 0

c  -1-1 --> -2
c    ( b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧  b^{2, 451}_0 ∧ -p_902) -> ( b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0)
c  in CNF:
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨  b^{2, 452}_2
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨  b^{2, 452}_1
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨  p_902 ∨ -b^{2, 452}_0
c  in DIMACS:
-5999  6000 -6001  902  6002 0
-5999  6000 -6001  902  6003 0
-5999  6000 -6001  902 -6004 0

c  -2-1 --> break 
c    ( b^{2, 451}_2 ∧  b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨  b^{2, 451}_0 ∨  p_902 ∨ break
c  in DIMACS:
-5999 -6000  6001  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 451}_2 ∧ -b^{2, 451}_1 ∧ -b^{2, 451}_0 ∧ true) 
c  in CNF:
c    -b^{2, 451}_2 ∨  b^{2, 451}_1 ∨  b^{2, 451}_0 ∨ false 
c  in DIMACS:
-5999  6000  6001  0

c  3 does not represent an automaton state.
c    -(-b^{2, 451}_2 ∧  b^{2, 451}_1 ∧  b^{2, 451}_0 ∧ true) 
c  in CNF:
c     b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ false 
c  in DIMACS:
 5999 -6000 -6001  0
c  -3 does not represent an automaton state.
c    -( b^{2, 451}_2 ∧  b^{2, 451}_1 ∧  b^{2, 451}_0 ∧ true) 
c  in CNF:
c    -b^{2, 451}_2 ∨ -b^{2, 451}_1 ∨ -b^{2, 451}_0 ∨ false 
c  in DIMACS:
-5999 -6000 -6001  0

c i = 452
c  -2+1 --> -1
c    ( b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧  p_904) -> ( b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0)
c  in CNF:
c    -b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨  b^{2, 453}_2
c    -b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_1
c    -b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨  b^{2, 453}_0
c  in DIMACS:
-6002 -6003  6004 -904  6005 0
-6002 -6003  6004 -904 -6006 0
-6002 -6003  6004 -904  6007 0

c  -1+1 --> 0
c    ( b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0 ∧  p_904) -> (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧ -b^{2, 453}_0)
c  in CNF:
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_2
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_1
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_0
c  in DIMACS:
-6002  6003 -6004 -904 -6005 0
-6002  6003 -6004 -904 -6006 0
-6002  6003 -6004 -904 -6007 0

c  0+1 --> 1
c    (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧  p_904) -> (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0)
c  in CNF:
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_2
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_1
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨  b^{2, 453}_0
c  in DIMACS:
 6002  6003  6004 -904 -6005 0
 6002  6003  6004 -904 -6006 0
 6002  6003  6004 -904  6007 0

c  1+1 --> 2
c    (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0 ∧  p_904) -> (-b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0)
c  in CNF:
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_2
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨  b^{2, 453}_1
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ -p_904 ∨ -b^{2, 453}_0
c  in DIMACS:
 6002  6003 -6004 -904 -6005 0
 6002  6003 -6004 -904  6006 0
 6002  6003 -6004 -904 -6007 0

c  2+1 --> break 
c    (-b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧  p_904) -> break
c  in CNF:
c     b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 6002 -6003  6004 -904 1162 0


c  2-1 --> 1
c    (-b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧ -p_904) -> (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0)
c  in CNF:
c     b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_2
c     b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_1
c     b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨  b^{2, 453}_0
c  in DIMACS:
 6002 -6003  6004  904 -6005 0
 6002 -6003  6004  904 -6006 0
 6002 -6003  6004  904  6007 0

c  1-1 --> 0
c    (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0 ∧ -p_904) -> (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧ -b^{2, 453}_0)
c  in CNF:
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_2
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_1
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_0
c  in DIMACS:
 6002  6003 -6004  904 -6005 0
 6002  6003 -6004  904 -6006 0
 6002  6003 -6004  904 -6007 0

c  0-1 --> -1
c    (-b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧ -p_904) -> ( b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0)
c  in CNF:
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨  b^{2, 453}_2
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_1
c     b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨  b^{2, 453}_0
c  in DIMACS:
 6002  6003  6004  904  6005 0
 6002  6003  6004  904 -6006 0
 6002  6003  6004  904  6007 0

c  -1-1 --> -2
c    ( b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧  b^{2, 452}_0 ∧ -p_904) -> ( b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0)
c  in CNF:
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨  b^{2, 453}_2
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨  b^{2, 453}_1
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨  p_904 ∨ -b^{2, 453}_0
c  in DIMACS:
-6002  6003 -6004  904  6005 0
-6002  6003 -6004  904  6006 0
-6002  6003 -6004  904 -6007 0

c  -2-1 --> break 
c    ( b^{2, 452}_2 ∧  b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨  b^{2, 452}_0 ∨  p_904 ∨ break
c  in DIMACS:
-6002 -6003  6004  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 452}_2 ∧ -b^{2, 452}_1 ∧ -b^{2, 452}_0 ∧ true) 
c  in CNF:
c    -b^{2, 452}_2 ∨  b^{2, 452}_1 ∨  b^{2, 452}_0 ∨ false 
c  in DIMACS:
-6002  6003  6004  0

c  3 does not represent an automaton state.
c    -(-b^{2, 452}_2 ∧  b^{2, 452}_1 ∧  b^{2, 452}_0 ∧ true) 
c  in CNF:
c     b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ false 
c  in DIMACS:
 6002 -6003 -6004  0
c  -3 does not represent an automaton state.
c    -( b^{2, 452}_2 ∧  b^{2, 452}_1 ∧  b^{2, 452}_0 ∧ true) 
c  in CNF:
c    -b^{2, 452}_2 ∨ -b^{2, 452}_1 ∨ -b^{2, 452}_0 ∨ false 
c  in DIMACS:
-6002 -6003 -6004  0

c i = 453
c  -2+1 --> -1
c    ( b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧  p_906) -> ( b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0)
c  in CNF:
c    -b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨  b^{2, 454}_2
c    -b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_1
c    -b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨  b^{2, 454}_0
c  in DIMACS:
-6005 -6006  6007 -906  6008 0
-6005 -6006  6007 -906 -6009 0
-6005 -6006  6007 -906  6010 0

c  -1+1 --> 0
c    ( b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0 ∧  p_906) -> (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧ -b^{2, 454}_0)
c  in CNF:
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_2
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_1
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_0
c  in DIMACS:
-6005  6006 -6007 -906 -6008 0
-6005  6006 -6007 -906 -6009 0
-6005  6006 -6007 -906 -6010 0

c  0+1 --> 1
c    (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧  p_906) -> (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0)
c  in CNF:
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_2
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_1
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨  b^{2, 454}_0
c  in DIMACS:
 6005  6006  6007 -906 -6008 0
 6005  6006  6007 -906 -6009 0
 6005  6006  6007 -906  6010 0

c  1+1 --> 2
c    (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0 ∧  p_906) -> (-b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0)
c  in CNF:
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_2
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨  b^{2, 454}_1
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ -p_906 ∨ -b^{2, 454}_0
c  in DIMACS:
 6005  6006 -6007 -906 -6008 0
 6005  6006 -6007 -906  6009 0
 6005  6006 -6007 -906 -6010 0

c  2+1 --> break 
c    (-b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧  p_906) -> break
c  in CNF:
c     b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 6005 -6006  6007 -906 1162 0


c  2-1 --> 1
c    (-b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧ -p_906) -> (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0)
c  in CNF:
c     b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_2
c     b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_1
c     b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨  b^{2, 454}_0
c  in DIMACS:
 6005 -6006  6007  906 -6008 0
 6005 -6006  6007  906 -6009 0
 6005 -6006  6007  906  6010 0

c  1-1 --> 0
c    (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0 ∧ -p_906) -> (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧ -b^{2, 454}_0)
c  in CNF:
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_2
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_1
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_0
c  in DIMACS:
 6005  6006 -6007  906 -6008 0
 6005  6006 -6007  906 -6009 0
 6005  6006 -6007  906 -6010 0

c  0-1 --> -1
c    (-b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧ -p_906) -> ( b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0)
c  in CNF:
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨  b^{2, 454}_2
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_1
c     b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨  b^{2, 454}_0
c  in DIMACS:
 6005  6006  6007  906  6008 0
 6005  6006  6007  906 -6009 0
 6005  6006  6007  906  6010 0

c  -1-1 --> -2
c    ( b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧  b^{2, 453}_0 ∧ -p_906) -> ( b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0)
c  in CNF:
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨  b^{2, 454}_2
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨  b^{2, 454}_1
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨  p_906 ∨ -b^{2, 454}_0
c  in DIMACS:
-6005  6006 -6007  906  6008 0
-6005  6006 -6007  906  6009 0
-6005  6006 -6007  906 -6010 0

c  -2-1 --> break 
c    ( b^{2, 453}_2 ∧  b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨  b^{2, 453}_0 ∨  p_906 ∨ break
c  in DIMACS:
-6005 -6006  6007  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 453}_2 ∧ -b^{2, 453}_1 ∧ -b^{2, 453}_0 ∧ true) 
c  in CNF:
c    -b^{2, 453}_2 ∨  b^{2, 453}_1 ∨  b^{2, 453}_0 ∨ false 
c  in DIMACS:
-6005  6006  6007  0

c  3 does not represent an automaton state.
c    -(-b^{2, 453}_2 ∧  b^{2, 453}_1 ∧  b^{2, 453}_0 ∧ true) 
c  in CNF:
c     b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ false 
c  in DIMACS:
 6005 -6006 -6007  0
c  -3 does not represent an automaton state.
c    -( b^{2, 453}_2 ∧  b^{2, 453}_1 ∧  b^{2, 453}_0 ∧ true) 
c  in CNF:
c    -b^{2, 453}_2 ∨ -b^{2, 453}_1 ∨ -b^{2, 453}_0 ∨ false 
c  in DIMACS:
-6005 -6006 -6007  0

c i = 454
c  -2+1 --> -1
c    ( b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧  p_908) -> ( b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0)
c  in CNF:
c    -b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨  b^{2, 455}_2
c    -b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_1
c    -b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨  b^{2, 455}_0
c  in DIMACS:
-6008 -6009  6010 -908  6011 0
-6008 -6009  6010 -908 -6012 0
-6008 -6009  6010 -908  6013 0

c  -1+1 --> 0
c    ( b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0 ∧  p_908) -> (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧ -b^{2, 455}_0)
c  in CNF:
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_2
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_1
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_0
c  in DIMACS:
-6008  6009 -6010 -908 -6011 0
-6008  6009 -6010 -908 -6012 0
-6008  6009 -6010 -908 -6013 0

c  0+1 --> 1
c    (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧  p_908) -> (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0)
c  in CNF:
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_2
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_1
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨  b^{2, 455}_0
c  in DIMACS:
 6008  6009  6010 -908 -6011 0
 6008  6009  6010 -908 -6012 0
 6008  6009  6010 -908  6013 0

c  1+1 --> 2
c    (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0 ∧  p_908) -> (-b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0)
c  in CNF:
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_2
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨  b^{2, 455}_1
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ -p_908 ∨ -b^{2, 455}_0
c  in DIMACS:
 6008  6009 -6010 -908 -6011 0
 6008  6009 -6010 -908  6012 0
 6008  6009 -6010 -908 -6013 0

c  2+1 --> break 
c    (-b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧  p_908) -> break
c  in CNF:
c     b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ -p_908 ∨ break
c  in DIMACS:
 6008 -6009  6010 -908 1162 0


c  2-1 --> 1
c    (-b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧ -p_908) -> (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0)
c  in CNF:
c     b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_2
c     b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_1
c     b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨  b^{2, 455}_0
c  in DIMACS:
 6008 -6009  6010  908 -6011 0
 6008 -6009  6010  908 -6012 0
 6008 -6009  6010  908  6013 0

c  1-1 --> 0
c    (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0 ∧ -p_908) -> (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧ -b^{2, 455}_0)
c  in CNF:
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_2
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_1
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_0
c  in DIMACS:
 6008  6009 -6010  908 -6011 0
 6008  6009 -6010  908 -6012 0
 6008  6009 -6010  908 -6013 0

c  0-1 --> -1
c    (-b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧ -p_908) -> ( b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0)
c  in CNF:
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨  b^{2, 455}_2
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_1
c     b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨  b^{2, 455}_0
c  in DIMACS:
 6008  6009  6010  908  6011 0
 6008  6009  6010  908 -6012 0
 6008  6009  6010  908  6013 0

c  -1-1 --> -2
c    ( b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧  b^{2, 454}_0 ∧ -p_908) -> ( b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0)
c  in CNF:
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨  b^{2, 455}_2
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨  b^{2, 455}_1
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨  p_908 ∨ -b^{2, 455}_0
c  in DIMACS:
-6008  6009 -6010  908  6011 0
-6008  6009 -6010  908  6012 0
-6008  6009 -6010  908 -6013 0

c  -2-1 --> break 
c    ( b^{2, 454}_2 ∧  b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧ -p_908) -> break
c  in CNF:
c    -b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨  b^{2, 454}_0 ∨  p_908 ∨ break
c  in DIMACS:
-6008 -6009  6010  908 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 454}_2 ∧ -b^{2, 454}_1 ∧ -b^{2, 454}_0 ∧ true) 
c  in CNF:
c    -b^{2, 454}_2 ∨  b^{2, 454}_1 ∨  b^{2, 454}_0 ∨ false 
c  in DIMACS:
-6008  6009  6010  0

c  3 does not represent an automaton state.
c    -(-b^{2, 454}_2 ∧  b^{2, 454}_1 ∧  b^{2, 454}_0 ∧ true) 
c  in CNF:
c     b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ false 
c  in DIMACS:
 6008 -6009 -6010  0
c  -3 does not represent an automaton state.
c    -( b^{2, 454}_2 ∧  b^{2, 454}_1 ∧  b^{2, 454}_0 ∧ true) 
c  in CNF:
c    -b^{2, 454}_2 ∨ -b^{2, 454}_1 ∨ -b^{2, 454}_0 ∨ false 
c  in DIMACS:
-6008 -6009 -6010  0

c i = 455
c  -2+1 --> -1
c    ( b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧  p_910) -> ( b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0)
c  in CNF:
c    -b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨  b^{2, 456}_2
c    -b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_1
c    -b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨  b^{2, 456}_0
c  in DIMACS:
-6011 -6012  6013 -910  6014 0
-6011 -6012  6013 -910 -6015 0
-6011 -6012  6013 -910  6016 0

c  -1+1 --> 0
c    ( b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0 ∧  p_910) -> (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧ -b^{2, 456}_0)
c  in CNF:
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_2
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_1
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_0
c  in DIMACS:
-6011  6012 -6013 -910 -6014 0
-6011  6012 -6013 -910 -6015 0
-6011  6012 -6013 -910 -6016 0

c  0+1 --> 1
c    (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧  p_910) -> (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0)
c  in CNF:
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_2
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_1
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨  b^{2, 456}_0
c  in DIMACS:
 6011  6012  6013 -910 -6014 0
 6011  6012  6013 -910 -6015 0
 6011  6012  6013 -910  6016 0

c  1+1 --> 2
c    (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0 ∧  p_910) -> (-b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0)
c  in CNF:
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_2
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨  b^{2, 456}_1
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ -p_910 ∨ -b^{2, 456}_0
c  in DIMACS:
 6011  6012 -6013 -910 -6014 0
 6011  6012 -6013 -910  6015 0
 6011  6012 -6013 -910 -6016 0

c  2+1 --> break 
c    (-b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧  p_910) -> break
c  in CNF:
c     b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 6011 -6012  6013 -910 1162 0


c  2-1 --> 1
c    (-b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧ -p_910) -> (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0)
c  in CNF:
c     b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_2
c     b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_1
c     b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨  b^{2, 456}_0
c  in DIMACS:
 6011 -6012  6013  910 -6014 0
 6011 -6012  6013  910 -6015 0
 6011 -6012  6013  910  6016 0

c  1-1 --> 0
c    (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0 ∧ -p_910) -> (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧ -b^{2, 456}_0)
c  in CNF:
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_2
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_1
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_0
c  in DIMACS:
 6011  6012 -6013  910 -6014 0
 6011  6012 -6013  910 -6015 0
 6011  6012 -6013  910 -6016 0

c  0-1 --> -1
c    (-b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧ -p_910) -> ( b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0)
c  in CNF:
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨  b^{2, 456}_2
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_1
c     b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨  b^{2, 456}_0
c  in DIMACS:
 6011  6012  6013  910  6014 0
 6011  6012  6013  910 -6015 0
 6011  6012  6013  910  6016 0

c  -1-1 --> -2
c    ( b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧  b^{2, 455}_0 ∧ -p_910) -> ( b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0)
c  in CNF:
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨  b^{2, 456}_2
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨  b^{2, 456}_1
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨  p_910 ∨ -b^{2, 456}_0
c  in DIMACS:
-6011  6012 -6013  910  6014 0
-6011  6012 -6013  910  6015 0
-6011  6012 -6013  910 -6016 0

c  -2-1 --> break 
c    ( b^{2, 455}_2 ∧  b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨  b^{2, 455}_0 ∨  p_910 ∨ break
c  in DIMACS:
-6011 -6012  6013  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 455}_2 ∧ -b^{2, 455}_1 ∧ -b^{2, 455}_0 ∧ true) 
c  in CNF:
c    -b^{2, 455}_2 ∨  b^{2, 455}_1 ∨  b^{2, 455}_0 ∨ false 
c  in DIMACS:
-6011  6012  6013  0

c  3 does not represent an automaton state.
c    -(-b^{2, 455}_2 ∧  b^{2, 455}_1 ∧  b^{2, 455}_0 ∧ true) 
c  in CNF:
c     b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ false 
c  in DIMACS:
 6011 -6012 -6013  0
c  -3 does not represent an automaton state.
c    -( b^{2, 455}_2 ∧  b^{2, 455}_1 ∧  b^{2, 455}_0 ∧ true) 
c  in CNF:
c    -b^{2, 455}_2 ∨ -b^{2, 455}_1 ∨ -b^{2, 455}_0 ∨ false 
c  in DIMACS:
-6011 -6012 -6013  0

c i = 456
c  -2+1 --> -1
c    ( b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧  p_912) -> ( b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0)
c  in CNF:
c    -b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨  b^{2, 457}_2
c    -b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_1
c    -b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨  b^{2, 457}_0
c  in DIMACS:
-6014 -6015  6016 -912  6017 0
-6014 -6015  6016 -912 -6018 0
-6014 -6015  6016 -912  6019 0

c  -1+1 --> 0
c    ( b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0 ∧  p_912) -> (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧ -b^{2, 457}_0)
c  in CNF:
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_2
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_1
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_0
c  in DIMACS:
-6014  6015 -6016 -912 -6017 0
-6014  6015 -6016 -912 -6018 0
-6014  6015 -6016 -912 -6019 0

c  0+1 --> 1
c    (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧  p_912) -> (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0)
c  in CNF:
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_2
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_1
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨  b^{2, 457}_0
c  in DIMACS:
 6014  6015  6016 -912 -6017 0
 6014  6015  6016 -912 -6018 0
 6014  6015  6016 -912  6019 0

c  1+1 --> 2
c    (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0 ∧  p_912) -> (-b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0)
c  in CNF:
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_2
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨  b^{2, 457}_1
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ -p_912 ∨ -b^{2, 457}_0
c  in DIMACS:
 6014  6015 -6016 -912 -6017 0
 6014  6015 -6016 -912  6018 0
 6014  6015 -6016 -912 -6019 0

c  2+1 --> break 
c    (-b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧  p_912) -> break
c  in CNF:
c     b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 6014 -6015  6016 -912 1162 0


c  2-1 --> 1
c    (-b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧ -p_912) -> (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0)
c  in CNF:
c     b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_2
c     b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_1
c     b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨  b^{2, 457}_0
c  in DIMACS:
 6014 -6015  6016  912 -6017 0
 6014 -6015  6016  912 -6018 0
 6014 -6015  6016  912  6019 0

c  1-1 --> 0
c    (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0 ∧ -p_912) -> (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧ -b^{2, 457}_0)
c  in CNF:
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_2
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_1
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_0
c  in DIMACS:
 6014  6015 -6016  912 -6017 0
 6014  6015 -6016  912 -6018 0
 6014  6015 -6016  912 -6019 0

c  0-1 --> -1
c    (-b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧ -p_912) -> ( b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0)
c  in CNF:
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨  b^{2, 457}_2
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_1
c     b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨  b^{2, 457}_0
c  in DIMACS:
 6014  6015  6016  912  6017 0
 6014  6015  6016  912 -6018 0
 6014  6015  6016  912  6019 0

c  -1-1 --> -2
c    ( b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧  b^{2, 456}_0 ∧ -p_912) -> ( b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0)
c  in CNF:
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨  b^{2, 457}_2
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨  b^{2, 457}_1
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨  p_912 ∨ -b^{2, 457}_0
c  in DIMACS:
-6014  6015 -6016  912  6017 0
-6014  6015 -6016  912  6018 0
-6014  6015 -6016  912 -6019 0

c  -2-1 --> break 
c    ( b^{2, 456}_2 ∧  b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨  b^{2, 456}_0 ∨  p_912 ∨ break
c  in DIMACS:
-6014 -6015  6016  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 456}_2 ∧ -b^{2, 456}_1 ∧ -b^{2, 456}_0 ∧ true) 
c  in CNF:
c    -b^{2, 456}_2 ∨  b^{2, 456}_1 ∨  b^{2, 456}_0 ∨ false 
c  in DIMACS:
-6014  6015  6016  0

c  3 does not represent an automaton state.
c    -(-b^{2, 456}_2 ∧  b^{2, 456}_1 ∧  b^{2, 456}_0 ∧ true) 
c  in CNF:
c     b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ false 
c  in DIMACS:
 6014 -6015 -6016  0
c  -3 does not represent an automaton state.
c    -( b^{2, 456}_2 ∧  b^{2, 456}_1 ∧  b^{2, 456}_0 ∧ true) 
c  in CNF:
c    -b^{2, 456}_2 ∨ -b^{2, 456}_1 ∨ -b^{2, 456}_0 ∨ false 
c  in DIMACS:
-6014 -6015 -6016  0

c i = 457
c  -2+1 --> -1
c    ( b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧  p_914) -> ( b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0)
c  in CNF:
c    -b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨  b^{2, 458}_2
c    -b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_1
c    -b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨  b^{2, 458}_0
c  in DIMACS:
-6017 -6018  6019 -914  6020 0
-6017 -6018  6019 -914 -6021 0
-6017 -6018  6019 -914  6022 0

c  -1+1 --> 0
c    ( b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0 ∧  p_914) -> (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧ -b^{2, 458}_0)
c  in CNF:
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_2
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_1
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_0
c  in DIMACS:
-6017  6018 -6019 -914 -6020 0
-6017  6018 -6019 -914 -6021 0
-6017  6018 -6019 -914 -6022 0

c  0+1 --> 1
c    (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧  p_914) -> (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0)
c  in CNF:
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_2
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_1
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨  b^{2, 458}_0
c  in DIMACS:
 6017  6018  6019 -914 -6020 0
 6017  6018  6019 -914 -6021 0
 6017  6018  6019 -914  6022 0

c  1+1 --> 2
c    (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0 ∧  p_914) -> (-b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0)
c  in CNF:
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_2
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨  b^{2, 458}_1
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ -p_914 ∨ -b^{2, 458}_0
c  in DIMACS:
 6017  6018 -6019 -914 -6020 0
 6017  6018 -6019 -914  6021 0
 6017  6018 -6019 -914 -6022 0

c  2+1 --> break 
c    (-b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧  p_914) -> break
c  in CNF:
c     b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ -p_914 ∨ break
c  in DIMACS:
 6017 -6018  6019 -914 1162 0


c  2-1 --> 1
c    (-b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧ -p_914) -> (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0)
c  in CNF:
c     b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_2
c     b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_1
c     b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨  b^{2, 458}_0
c  in DIMACS:
 6017 -6018  6019  914 -6020 0
 6017 -6018  6019  914 -6021 0
 6017 -6018  6019  914  6022 0

c  1-1 --> 0
c    (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0 ∧ -p_914) -> (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧ -b^{2, 458}_0)
c  in CNF:
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_2
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_1
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_0
c  in DIMACS:
 6017  6018 -6019  914 -6020 0
 6017  6018 -6019  914 -6021 0
 6017  6018 -6019  914 -6022 0

c  0-1 --> -1
c    (-b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧ -p_914) -> ( b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0)
c  in CNF:
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨  b^{2, 458}_2
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_1
c     b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨  b^{2, 458}_0
c  in DIMACS:
 6017  6018  6019  914  6020 0
 6017  6018  6019  914 -6021 0
 6017  6018  6019  914  6022 0

c  -1-1 --> -2
c    ( b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧  b^{2, 457}_0 ∧ -p_914) -> ( b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0)
c  in CNF:
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨  b^{2, 458}_2
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨  b^{2, 458}_1
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨  p_914 ∨ -b^{2, 458}_0
c  in DIMACS:
-6017  6018 -6019  914  6020 0
-6017  6018 -6019  914  6021 0
-6017  6018 -6019  914 -6022 0

c  -2-1 --> break 
c    ( b^{2, 457}_2 ∧  b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧ -p_914) -> break
c  in CNF:
c    -b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨  b^{2, 457}_0 ∨  p_914 ∨ break
c  in DIMACS:
-6017 -6018  6019  914 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 457}_2 ∧ -b^{2, 457}_1 ∧ -b^{2, 457}_0 ∧ true) 
c  in CNF:
c    -b^{2, 457}_2 ∨  b^{2, 457}_1 ∨  b^{2, 457}_0 ∨ false 
c  in DIMACS:
-6017  6018  6019  0

c  3 does not represent an automaton state.
c    -(-b^{2, 457}_2 ∧  b^{2, 457}_1 ∧  b^{2, 457}_0 ∧ true) 
c  in CNF:
c     b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ false 
c  in DIMACS:
 6017 -6018 -6019  0
c  -3 does not represent an automaton state.
c    -( b^{2, 457}_2 ∧  b^{2, 457}_1 ∧  b^{2, 457}_0 ∧ true) 
c  in CNF:
c    -b^{2, 457}_2 ∨ -b^{2, 457}_1 ∨ -b^{2, 457}_0 ∨ false 
c  in DIMACS:
-6017 -6018 -6019  0

c i = 458
c  -2+1 --> -1
c    ( b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧  p_916) -> ( b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0)
c  in CNF:
c    -b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨  b^{2, 459}_2
c    -b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_1
c    -b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨  b^{2, 459}_0
c  in DIMACS:
-6020 -6021  6022 -916  6023 0
-6020 -6021  6022 -916 -6024 0
-6020 -6021  6022 -916  6025 0

c  -1+1 --> 0
c    ( b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0 ∧  p_916) -> (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧ -b^{2, 459}_0)
c  in CNF:
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_2
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_1
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_0
c  in DIMACS:
-6020  6021 -6022 -916 -6023 0
-6020  6021 -6022 -916 -6024 0
-6020  6021 -6022 -916 -6025 0

c  0+1 --> 1
c    (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧  p_916) -> (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0)
c  in CNF:
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_2
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_1
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨  b^{2, 459}_0
c  in DIMACS:
 6020  6021  6022 -916 -6023 0
 6020  6021  6022 -916 -6024 0
 6020  6021  6022 -916  6025 0

c  1+1 --> 2
c    (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0 ∧  p_916) -> (-b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0)
c  in CNF:
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_2
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨  b^{2, 459}_1
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ -p_916 ∨ -b^{2, 459}_0
c  in DIMACS:
 6020  6021 -6022 -916 -6023 0
 6020  6021 -6022 -916  6024 0
 6020  6021 -6022 -916 -6025 0

c  2+1 --> break 
c    (-b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧  p_916) -> break
c  in CNF:
c     b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ -p_916 ∨ break
c  in DIMACS:
 6020 -6021  6022 -916 1162 0


c  2-1 --> 1
c    (-b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧ -p_916) -> (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0)
c  in CNF:
c     b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_2
c     b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_1
c     b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨  b^{2, 459}_0
c  in DIMACS:
 6020 -6021  6022  916 -6023 0
 6020 -6021  6022  916 -6024 0
 6020 -6021  6022  916  6025 0

c  1-1 --> 0
c    (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0 ∧ -p_916) -> (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧ -b^{2, 459}_0)
c  in CNF:
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_2
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_1
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_0
c  in DIMACS:
 6020  6021 -6022  916 -6023 0
 6020  6021 -6022  916 -6024 0
 6020  6021 -6022  916 -6025 0

c  0-1 --> -1
c    (-b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧ -p_916) -> ( b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0)
c  in CNF:
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨  b^{2, 459}_2
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_1
c     b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨  b^{2, 459}_0
c  in DIMACS:
 6020  6021  6022  916  6023 0
 6020  6021  6022  916 -6024 0
 6020  6021  6022  916  6025 0

c  -1-1 --> -2
c    ( b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧  b^{2, 458}_0 ∧ -p_916) -> ( b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0)
c  in CNF:
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨  b^{2, 459}_2
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨  b^{2, 459}_1
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨  p_916 ∨ -b^{2, 459}_0
c  in DIMACS:
-6020  6021 -6022  916  6023 0
-6020  6021 -6022  916  6024 0
-6020  6021 -6022  916 -6025 0

c  -2-1 --> break 
c    ( b^{2, 458}_2 ∧  b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧ -p_916) -> break
c  in CNF:
c    -b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨  b^{2, 458}_0 ∨  p_916 ∨ break
c  in DIMACS:
-6020 -6021  6022  916 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 458}_2 ∧ -b^{2, 458}_1 ∧ -b^{2, 458}_0 ∧ true) 
c  in CNF:
c    -b^{2, 458}_2 ∨  b^{2, 458}_1 ∨  b^{2, 458}_0 ∨ false 
c  in DIMACS:
-6020  6021  6022  0

c  3 does not represent an automaton state.
c    -(-b^{2, 458}_2 ∧  b^{2, 458}_1 ∧  b^{2, 458}_0 ∧ true) 
c  in CNF:
c     b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ false 
c  in DIMACS:
 6020 -6021 -6022  0
c  -3 does not represent an automaton state.
c    -( b^{2, 458}_2 ∧  b^{2, 458}_1 ∧  b^{2, 458}_0 ∧ true) 
c  in CNF:
c    -b^{2, 458}_2 ∨ -b^{2, 458}_1 ∨ -b^{2, 458}_0 ∨ false 
c  in DIMACS:
-6020 -6021 -6022  0

c i = 459
c  -2+1 --> -1
c    ( b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧  p_918) -> ( b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0)
c  in CNF:
c    -b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨  b^{2, 460}_2
c    -b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_1
c    -b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨  b^{2, 460}_0
c  in DIMACS:
-6023 -6024  6025 -918  6026 0
-6023 -6024  6025 -918 -6027 0
-6023 -6024  6025 -918  6028 0

c  -1+1 --> 0
c    ( b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0 ∧  p_918) -> (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧ -b^{2, 460}_0)
c  in CNF:
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_2
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_1
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_0
c  in DIMACS:
-6023  6024 -6025 -918 -6026 0
-6023  6024 -6025 -918 -6027 0
-6023  6024 -6025 -918 -6028 0

c  0+1 --> 1
c    (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧  p_918) -> (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0)
c  in CNF:
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_2
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_1
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨  b^{2, 460}_0
c  in DIMACS:
 6023  6024  6025 -918 -6026 0
 6023  6024  6025 -918 -6027 0
 6023  6024  6025 -918  6028 0

c  1+1 --> 2
c    (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0 ∧  p_918) -> (-b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0)
c  in CNF:
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_2
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨  b^{2, 460}_1
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ -p_918 ∨ -b^{2, 460}_0
c  in DIMACS:
 6023  6024 -6025 -918 -6026 0
 6023  6024 -6025 -918  6027 0
 6023  6024 -6025 -918 -6028 0

c  2+1 --> break 
c    (-b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧  p_918) -> break
c  in CNF:
c     b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 6023 -6024  6025 -918 1162 0


c  2-1 --> 1
c    (-b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧ -p_918) -> (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0)
c  in CNF:
c     b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_2
c     b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_1
c     b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨  b^{2, 460}_0
c  in DIMACS:
 6023 -6024  6025  918 -6026 0
 6023 -6024  6025  918 -6027 0
 6023 -6024  6025  918  6028 0

c  1-1 --> 0
c    (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0 ∧ -p_918) -> (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧ -b^{2, 460}_0)
c  in CNF:
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_2
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_1
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_0
c  in DIMACS:
 6023  6024 -6025  918 -6026 0
 6023  6024 -6025  918 -6027 0
 6023  6024 -6025  918 -6028 0

c  0-1 --> -1
c    (-b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧ -p_918) -> ( b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0)
c  in CNF:
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨  b^{2, 460}_2
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_1
c     b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨  b^{2, 460}_0
c  in DIMACS:
 6023  6024  6025  918  6026 0
 6023  6024  6025  918 -6027 0
 6023  6024  6025  918  6028 0

c  -1-1 --> -2
c    ( b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧  b^{2, 459}_0 ∧ -p_918) -> ( b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0)
c  in CNF:
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨  b^{2, 460}_2
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨  b^{2, 460}_1
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨  p_918 ∨ -b^{2, 460}_0
c  in DIMACS:
-6023  6024 -6025  918  6026 0
-6023  6024 -6025  918  6027 0
-6023  6024 -6025  918 -6028 0

c  -2-1 --> break 
c    ( b^{2, 459}_2 ∧  b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨  b^{2, 459}_0 ∨  p_918 ∨ break
c  in DIMACS:
-6023 -6024  6025  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 459}_2 ∧ -b^{2, 459}_1 ∧ -b^{2, 459}_0 ∧ true) 
c  in CNF:
c    -b^{2, 459}_2 ∨  b^{2, 459}_1 ∨  b^{2, 459}_0 ∨ false 
c  in DIMACS:
-6023  6024  6025  0

c  3 does not represent an automaton state.
c    -(-b^{2, 459}_2 ∧  b^{2, 459}_1 ∧  b^{2, 459}_0 ∧ true) 
c  in CNF:
c     b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ false 
c  in DIMACS:
 6023 -6024 -6025  0
c  -3 does not represent an automaton state.
c    -( b^{2, 459}_2 ∧  b^{2, 459}_1 ∧  b^{2, 459}_0 ∧ true) 
c  in CNF:
c    -b^{2, 459}_2 ∨ -b^{2, 459}_1 ∨ -b^{2, 459}_0 ∨ false 
c  in DIMACS:
-6023 -6024 -6025  0

c i = 460
c  -2+1 --> -1
c    ( b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧  p_920) -> ( b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0)
c  in CNF:
c    -b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨  b^{2, 461}_2
c    -b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_1
c    -b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨  b^{2, 461}_0
c  in DIMACS:
-6026 -6027  6028 -920  6029 0
-6026 -6027  6028 -920 -6030 0
-6026 -6027  6028 -920  6031 0

c  -1+1 --> 0
c    ( b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0 ∧  p_920) -> (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧ -b^{2, 461}_0)
c  in CNF:
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_2
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_1
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_0
c  in DIMACS:
-6026  6027 -6028 -920 -6029 0
-6026  6027 -6028 -920 -6030 0
-6026  6027 -6028 -920 -6031 0

c  0+1 --> 1
c    (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧  p_920) -> (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0)
c  in CNF:
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_2
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_1
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨  b^{2, 461}_0
c  in DIMACS:
 6026  6027  6028 -920 -6029 0
 6026  6027  6028 -920 -6030 0
 6026  6027  6028 -920  6031 0

c  1+1 --> 2
c    (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0 ∧  p_920) -> (-b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0)
c  in CNF:
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_2
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨  b^{2, 461}_1
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ -p_920 ∨ -b^{2, 461}_0
c  in DIMACS:
 6026  6027 -6028 -920 -6029 0
 6026  6027 -6028 -920  6030 0
 6026  6027 -6028 -920 -6031 0

c  2+1 --> break 
c    (-b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧  p_920) -> break
c  in CNF:
c     b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 6026 -6027  6028 -920 1162 0


c  2-1 --> 1
c    (-b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧ -p_920) -> (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0)
c  in CNF:
c     b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_2
c     b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_1
c     b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨  b^{2, 461}_0
c  in DIMACS:
 6026 -6027  6028  920 -6029 0
 6026 -6027  6028  920 -6030 0
 6026 -6027  6028  920  6031 0

c  1-1 --> 0
c    (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0 ∧ -p_920) -> (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧ -b^{2, 461}_0)
c  in CNF:
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_2
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_1
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_0
c  in DIMACS:
 6026  6027 -6028  920 -6029 0
 6026  6027 -6028  920 -6030 0
 6026  6027 -6028  920 -6031 0

c  0-1 --> -1
c    (-b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧ -p_920) -> ( b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0)
c  in CNF:
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨  b^{2, 461}_2
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_1
c     b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨  b^{2, 461}_0
c  in DIMACS:
 6026  6027  6028  920  6029 0
 6026  6027  6028  920 -6030 0
 6026  6027  6028  920  6031 0

c  -1-1 --> -2
c    ( b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧  b^{2, 460}_0 ∧ -p_920) -> ( b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0)
c  in CNF:
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨  b^{2, 461}_2
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨  b^{2, 461}_1
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨  p_920 ∨ -b^{2, 461}_0
c  in DIMACS:
-6026  6027 -6028  920  6029 0
-6026  6027 -6028  920  6030 0
-6026  6027 -6028  920 -6031 0

c  -2-1 --> break 
c    ( b^{2, 460}_2 ∧  b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨  b^{2, 460}_0 ∨  p_920 ∨ break
c  in DIMACS:
-6026 -6027  6028  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 460}_2 ∧ -b^{2, 460}_1 ∧ -b^{2, 460}_0 ∧ true) 
c  in CNF:
c    -b^{2, 460}_2 ∨  b^{2, 460}_1 ∨  b^{2, 460}_0 ∨ false 
c  in DIMACS:
-6026  6027  6028  0

c  3 does not represent an automaton state.
c    -(-b^{2, 460}_2 ∧  b^{2, 460}_1 ∧  b^{2, 460}_0 ∧ true) 
c  in CNF:
c     b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ false 
c  in DIMACS:
 6026 -6027 -6028  0
c  -3 does not represent an automaton state.
c    -( b^{2, 460}_2 ∧  b^{2, 460}_1 ∧  b^{2, 460}_0 ∧ true) 
c  in CNF:
c    -b^{2, 460}_2 ∨ -b^{2, 460}_1 ∨ -b^{2, 460}_0 ∨ false 
c  in DIMACS:
-6026 -6027 -6028  0

c i = 461
c  -2+1 --> -1
c    ( b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧  p_922) -> ( b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0)
c  in CNF:
c    -b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨  b^{2, 462}_2
c    -b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_1
c    -b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨  b^{2, 462}_0
c  in DIMACS:
-6029 -6030  6031 -922  6032 0
-6029 -6030  6031 -922 -6033 0
-6029 -6030  6031 -922  6034 0

c  -1+1 --> 0
c    ( b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0 ∧  p_922) -> (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧ -b^{2, 462}_0)
c  in CNF:
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_2
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_1
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_0
c  in DIMACS:
-6029  6030 -6031 -922 -6032 0
-6029  6030 -6031 -922 -6033 0
-6029  6030 -6031 -922 -6034 0

c  0+1 --> 1
c    (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧  p_922) -> (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0)
c  in CNF:
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_2
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_1
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨  b^{2, 462}_0
c  in DIMACS:
 6029  6030  6031 -922 -6032 0
 6029  6030  6031 -922 -6033 0
 6029  6030  6031 -922  6034 0

c  1+1 --> 2
c    (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0 ∧  p_922) -> (-b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0)
c  in CNF:
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_2
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨  b^{2, 462}_1
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ -p_922 ∨ -b^{2, 462}_0
c  in DIMACS:
 6029  6030 -6031 -922 -6032 0
 6029  6030 -6031 -922  6033 0
 6029  6030 -6031 -922 -6034 0

c  2+1 --> break 
c    (-b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧  p_922) -> break
c  in CNF:
c     b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ -p_922 ∨ break
c  in DIMACS:
 6029 -6030  6031 -922 1162 0


c  2-1 --> 1
c    (-b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧ -p_922) -> (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0)
c  in CNF:
c     b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_2
c     b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_1
c     b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨  b^{2, 462}_0
c  in DIMACS:
 6029 -6030  6031  922 -6032 0
 6029 -6030  6031  922 -6033 0
 6029 -6030  6031  922  6034 0

c  1-1 --> 0
c    (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0 ∧ -p_922) -> (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧ -b^{2, 462}_0)
c  in CNF:
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_2
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_1
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_0
c  in DIMACS:
 6029  6030 -6031  922 -6032 0
 6029  6030 -6031  922 -6033 0
 6029  6030 -6031  922 -6034 0

c  0-1 --> -1
c    (-b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧ -p_922) -> ( b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0)
c  in CNF:
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨  b^{2, 462}_2
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_1
c     b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨  b^{2, 462}_0
c  in DIMACS:
 6029  6030  6031  922  6032 0
 6029  6030  6031  922 -6033 0
 6029  6030  6031  922  6034 0

c  -1-1 --> -2
c    ( b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧  b^{2, 461}_0 ∧ -p_922) -> ( b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0)
c  in CNF:
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨  b^{2, 462}_2
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨  b^{2, 462}_1
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨  p_922 ∨ -b^{2, 462}_0
c  in DIMACS:
-6029  6030 -6031  922  6032 0
-6029  6030 -6031  922  6033 0
-6029  6030 -6031  922 -6034 0

c  -2-1 --> break 
c    ( b^{2, 461}_2 ∧  b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧ -p_922) -> break
c  in CNF:
c    -b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨  b^{2, 461}_0 ∨  p_922 ∨ break
c  in DIMACS:
-6029 -6030  6031  922 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 461}_2 ∧ -b^{2, 461}_1 ∧ -b^{2, 461}_0 ∧ true) 
c  in CNF:
c    -b^{2, 461}_2 ∨  b^{2, 461}_1 ∨  b^{2, 461}_0 ∨ false 
c  in DIMACS:
-6029  6030  6031  0

c  3 does not represent an automaton state.
c    -(-b^{2, 461}_2 ∧  b^{2, 461}_1 ∧  b^{2, 461}_0 ∧ true) 
c  in CNF:
c     b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ false 
c  in DIMACS:
 6029 -6030 -6031  0
c  -3 does not represent an automaton state.
c    -( b^{2, 461}_2 ∧  b^{2, 461}_1 ∧  b^{2, 461}_0 ∧ true) 
c  in CNF:
c    -b^{2, 461}_2 ∨ -b^{2, 461}_1 ∨ -b^{2, 461}_0 ∨ false 
c  in DIMACS:
-6029 -6030 -6031  0

c i = 462
c  -2+1 --> -1
c    ( b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧  p_924) -> ( b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0)
c  in CNF:
c    -b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨  b^{2, 463}_2
c    -b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_1
c    -b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨  b^{2, 463}_0
c  in DIMACS:
-6032 -6033  6034 -924  6035 0
-6032 -6033  6034 -924 -6036 0
-6032 -6033  6034 -924  6037 0

c  -1+1 --> 0
c    ( b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0 ∧  p_924) -> (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧ -b^{2, 463}_0)
c  in CNF:
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_2
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_1
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_0
c  in DIMACS:
-6032  6033 -6034 -924 -6035 0
-6032  6033 -6034 -924 -6036 0
-6032  6033 -6034 -924 -6037 0

c  0+1 --> 1
c    (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧  p_924) -> (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0)
c  in CNF:
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_2
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_1
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨  b^{2, 463}_0
c  in DIMACS:
 6032  6033  6034 -924 -6035 0
 6032  6033  6034 -924 -6036 0
 6032  6033  6034 -924  6037 0

c  1+1 --> 2
c    (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0 ∧  p_924) -> (-b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0)
c  in CNF:
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_2
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨  b^{2, 463}_1
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ -p_924 ∨ -b^{2, 463}_0
c  in DIMACS:
 6032  6033 -6034 -924 -6035 0
 6032  6033 -6034 -924  6036 0
 6032  6033 -6034 -924 -6037 0

c  2+1 --> break 
c    (-b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧  p_924) -> break
c  in CNF:
c     b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 6032 -6033  6034 -924 1162 0


c  2-1 --> 1
c    (-b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧ -p_924) -> (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0)
c  in CNF:
c     b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_2
c     b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_1
c     b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨  b^{2, 463}_0
c  in DIMACS:
 6032 -6033  6034  924 -6035 0
 6032 -6033  6034  924 -6036 0
 6032 -6033  6034  924  6037 0

c  1-1 --> 0
c    (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0 ∧ -p_924) -> (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧ -b^{2, 463}_0)
c  in CNF:
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_2
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_1
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_0
c  in DIMACS:
 6032  6033 -6034  924 -6035 0
 6032  6033 -6034  924 -6036 0
 6032  6033 -6034  924 -6037 0

c  0-1 --> -1
c    (-b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧ -p_924) -> ( b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0)
c  in CNF:
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨  b^{2, 463}_2
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_1
c     b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨  b^{2, 463}_0
c  in DIMACS:
 6032  6033  6034  924  6035 0
 6032  6033  6034  924 -6036 0
 6032  6033  6034  924  6037 0

c  -1-1 --> -2
c    ( b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧  b^{2, 462}_0 ∧ -p_924) -> ( b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0)
c  in CNF:
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨  b^{2, 463}_2
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨  b^{2, 463}_1
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨  p_924 ∨ -b^{2, 463}_0
c  in DIMACS:
-6032  6033 -6034  924  6035 0
-6032  6033 -6034  924  6036 0
-6032  6033 -6034  924 -6037 0

c  -2-1 --> break 
c    ( b^{2, 462}_2 ∧  b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨  b^{2, 462}_0 ∨  p_924 ∨ break
c  in DIMACS:
-6032 -6033  6034  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 462}_2 ∧ -b^{2, 462}_1 ∧ -b^{2, 462}_0 ∧ true) 
c  in CNF:
c    -b^{2, 462}_2 ∨  b^{2, 462}_1 ∨  b^{2, 462}_0 ∨ false 
c  in DIMACS:
-6032  6033  6034  0

c  3 does not represent an automaton state.
c    -(-b^{2, 462}_2 ∧  b^{2, 462}_1 ∧  b^{2, 462}_0 ∧ true) 
c  in CNF:
c     b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ false 
c  in DIMACS:
 6032 -6033 -6034  0
c  -3 does not represent an automaton state.
c    -( b^{2, 462}_2 ∧  b^{2, 462}_1 ∧  b^{2, 462}_0 ∧ true) 
c  in CNF:
c    -b^{2, 462}_2 ∨ -b^{2, 462}_1 ∨ -b^{2, 462}_0 ∨ false 
c  in DIMACS:
-6032 -6033 -6034  0

c i = 463
c  -2+1 --> -1
c    ( b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧  p_926) -> ( b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0)
c  in CNF:
c    -b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨  b^{2, 464}_2
c    -b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_1
c    -b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨  b^{2, 464}_0
c  in DIMACS:
-6035 -6036  6037 -926  6038 0
-6035 -6036  6037 -926 -6039 0
-6035 -6036  6037 -926  6040 0

c  -1+1 --> 0
c    ( b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0 ∧  p_926) -> (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧ -b^{2, 464}_0)
c  in CNF:
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_2
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_1
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_0
c  in DIMACS:
-6035  6036 -6037 -926 -6038 0
-6035  6036 -6037 -926 -6039 0
-6035  6036 -6037 -926 -6040 0

c  0+1 --> 1
c    (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧  p_926) -> (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0)
c  in CNF:
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_2
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_1
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨  b^{2, 464}_0
c  in DIMACS:
 6035  6036  6037 -926 -6038 0
 6035  6036  6037 -926 -6039 0
 6035  6036  6037 -926  6040 0

c  1+1 --> 2
c    (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0 ∧  p_926) -> (-b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0)
c  in CNF:
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_2
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨  b^{2, 464}_1
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ -p_926 ∨ -b^{2, 464}_0
c  in DIMACS:
 6035  6036 -6037 -926 -6038 0
 6035  6036 -6037 -926  6039 0
 6035  6036 -6037 -926 -6040 0

c  2+1 --> break 
c    (-b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧  p_926) -> break
c  in CNF:
c     b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ -p_926 ∨ break
c  in DIMACS:
 6035 -6036  6037 -926 1162 0


c  2-1 --> 1
c    (-b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧ -p_926) -> (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0)
c  in CNF:
c     b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_2
c     b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_1
c     b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨  b^{2, 464}_0
c  in DIMACS:
 6035 -6036  6037  926 -6038 0
 6035 -6036  6037  926 -6039 0
 6035 -6036  6037  926  6040 0

c  1-1 --> 0
c    (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0 ∧ -p_926) -> (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧ -b^{2, 464}_0)
c  in CNF:
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_2
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_1
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_0
c  in DIMACS:
 6035  6036 -6037  926 -6038 0
 6035  6036 -6037  926 -6039 0
 6035  6036 -6037  926 -6040 0

c  0-1 --> -1
c    (-b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧ -p_926) -> ( b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0)
c  in CNF:
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨  b^{2, 464}_2
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_1
c     b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨  b^{2, 464}_0
c  in DIMACS:
 6035  6036  6037  926  6038 0
 6035  6036  6037  926 -6039 0
 6035  6036  6037  926  6040 0

c  -1-1 --> -2
c    ( b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧  b^{2, 463}_0 ∧ -p_926) -> ( b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0)
c  in CNF:
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨  b^{2, 464}_2
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨  b^{2, 464}_1
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨  p_926 ∨ -b^{2, 464}_0
c  in DIMACS:
-6035  6036 -6037  926  6038 0
-6035  6036 -6037  926  6039 0
-6035  6036 -6037  926 -6040 0

c  -2-1 --> break 
c    ( b^{2, 463}_2 ∧  b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧ -p_926) -> break
c  in CNF:
c    -b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨  b^{2, 463}_0 ∨  p_926 ∨ break
c  in DIMACS:
-6035 -6036  6037  926 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 463}_2 ∧ -b^{2, 463}_1 ∧ -b^{2, 463}_0 ∧ true) 
c  in CNF:
c    -b^{2, 463}_2 ∨  b^{2, 463}_1 ∨  b^{2, 463}_0 ∨ false 
c  in DIMACS:
-6035  6036  6037  0

c  3 does not represent an automaton state.
c    -(-b^{2, 463}_2 ∧  b^{2, 463}_1 ∧  b^{2, 463}_0 ∧ true) 
c  in CNF:
c     b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ false 
c  in DIMACS:
 6035 -6036 -6037  0
c  -3 does not represent an automaton state.
c    -( b^{2, 463}_2 ∧  b^{2, 463}_1 ∧  b^{2, 463}_0 ∧ true) 
c  in CNF:
c    -b^{2, 463}_2 ∨ -b^{2, 463}_1 ∨ -b^{2, 463}_0 ∨ false 
c  in DIMACS:
-6035 -6036 -6037  0

c i = 464
c  -2+1 --> -1
c    ( b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧  p_928) -> ( b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0)
c  in CNF:
c    -b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨  b^{2, 465}_2
c    -b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_1
c    -b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨  b^{2, 465}_0
c  in DIMACS:
-6038 -6039  6040 -928  6041 0
-6038 -6039  6040 -928 -6042 0
-6038 -6039  6040 -928  6043 0

c  -1+1 --> 0
c    ( b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0 ∧  p_928) -> (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧ -b^{2, 465}_0)
c  in CNF:
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_2
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_1
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_0
c  in DIMACS:
-6038  6039 -6040 -928 -6041 0
-6038  6039 -6040 -928 -6042 0
-6038  6039 -6040 -928 -6043 0

c  0+1 --> 1
c    (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧  p_928) -> (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0)
c  in CNF:
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_2
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_1
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨  b^{2, 465}_0
c  in DIMACS:
 6038  6039  6040 -928 -6041 0
 6038  6039  6040 -928 -6042 0
 6038  6039  6040 -928  6043 0

c  1+1 --> 2
c    (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0 ∧  p_928) -> (-b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0)
c  in CNF:
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_2
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨  b^{2, 465}_1
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ -p_928 ∨ -b^{2, 465}_0
c  in DIMACS:
 6038  6039 -6040 -928 -6041 0
 6038  6039 -6040 -928  6042 0
 6038  6039 -6040 -928 -6043 0

c  2+1 --> break 
c    (-b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧  p_928) -> break
c  in CNF:
c     b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 6038 -6039  6040 -928 1162 0


c  2-1 --> 1
c    (-b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧ -p_928) -> (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0)
c  in CNF:
c     b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_2
c     b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_1
c     b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨  b^{2, 465}_0
c  in DIMACS:
 6038 -6039  6040  928 -6041 0
 6038 -6039  6040  928 -6042 0
 6038 -6039  6040  928  6043 0

c  1-1 --> 0
c    (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0 ∧ -p_928) -> (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧ -b^{2, 465}_0)
c  in CNF:
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_2
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_1
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_0
c  in DIMACS:
 6038  6039 -6040  928 -6041 0
 6038  6039 -6040  928 -6042 0
 6038  6039 -6040  928 -6043 0

c  0-1 --> -1
c    (-b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧ -p_928) -> ( b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0)
c  in CNF:
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨  b^{2, 465}_2
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_1
c     b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨  b^{2, 465}_0
c  in DIMACS:
 6038  6039  6040  928  6041 0
 6038  6039  6040  928 -6042 0
 6038  6039  6040  928  6043 0

c  -1-1 --> -2
c    ( b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧  b^{2, 464}_0 ∧ -p_928) -> ( b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0)
c  in CNF:
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨  b^{2, 465}_2
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨  b^{2, 465}_1
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨  p_928 ∨ -b^{2, 465}_0
c  in DIMACS:
-6038  6039 -6040  928  6041 0
-6038  6039 -6040  928  6042 0
-6038  6039 -6040  928 -6043 0

c  -2-1 --> break 
c    ( b^{2, 464}_2 ∧  b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨  b^{2, 464}_0 ∨  p_928 ∨ break
c  in DIMACS:
-6038 -6039  6040  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 464}_2 ∧ -b^{2, 464}_1 ∧ -b^{2, 464}_0 ∧ true) 
c  in CNF:
c    -b^{2, 464}_2 ∨  b^{2, 464}_1 ∨  b^{2, 464}_0 ∨ false 
c  in DIMACS:
-6038  6039  6040  0

c  3 does not represent an automaton state.
c    -(-b^{2, 464}_2 ∧  b^{2, 464}_1 ∧  b^{2, 464}_0 ∧ true) 
c  in CNF:
c     b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ false 
c  in DIMACS:
 6038 -6039 -6040  0
c  -3 does not represent an automaton state.
c    -( b^{2, 464}_2 ∧  b^{2, 464}_1 ∧  b^{2, 464}_0 ∧ true) 
c  in CNF:
c    -b^{2, 464}_2 ∨ -b^{2, 464}_1 ∨ -b^{2, 464}_0 ∨ false 
c  in DIMACS:
-6038 -6039 -6040  0

c i = 465
c  -2+1 --> -1
c    ( b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧  p_930) -> ( b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0)
c  in CNF:
c    -b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨  b^{2, 466}_2
c    -b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_1
c    -b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨  b^{2, 466}_0
c  in DIMACS:
-6041 -6042  6043 -930  6044 0
-6041 -6042  6043 -930 -6045 0
-6041 -6042  6043 -930  6046 0

c  -1+1 --> 0
c    ( b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0 ∧  p_930) -> (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧ -b^{2, 466}_0)
c  in CNF:
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_2
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_1
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_0
c  in DIMACS:
-6041  6042 -6043 -930 -6044 0
-6041  6042 -6043 -930 -6045 0
-6041  6042 -6043 -930 -6046 0

c  0+1 --> 1
c    (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧  p_930) -> (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0)
c  in CNF:
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_2
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_1
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨  b^{2, 466}_0
c  in DIMACS:
 6041  6042  6043 -930 -6044 0
 6041  6042  6043 -930 -6045 0
 6041  6042  6043 -930  6046 0

c  1+1 --> 2
c    (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0 ∧  p_930) -> (-b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0)
c  in CNF:
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_2
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨  b^{2, 466}_1
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ -p_930 ∨ -b^{2, 466}_0
c  in DIMACS:
 6041  6042 -6043 -930 -6044 0
 6041  6042 -6043 -930  6045 0
 6041  6042 -6043 -930 -6046 0

c  2+1 --> break 
c    (-b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧  p_930) -> break
c  in CNF:
c     b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 6041 -6042  6043 -930 1162 0


c  2-1 --> 1
c    (-b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧ -p_930) -> (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0)
c  in CNF:
c     b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_2
c     b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_1
c     b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨  b^{2, 466}_0
c  in DIMACS:
 6041 -6042  6043  930 -6044 0
 6041 -6042  6043  930 -6045 0
 6041 -6042  6043  930  6046 0

c  1-1 --> 0
c    (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0 ∧ -p_930) -> (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧ -b^{2, 466}_0)
c  in CNF:
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_2
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_1
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_0
c  in DIMACS:
 6041  6042 -6043  930 -6044 0
 6041  6042 -6043  930 -6045 0
 6041  6042 -6043  930 -6046 0

c  0-1 --> -1
c    (-b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧ -p_930) -> ( b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0)
c  in CNF:
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨  b^{2, 466}_2
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_1
c     b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨  b^{2, 466}_0
c  in DIMACS:
 6041  6042  6043  930  6044 0
 6041  6042  6043  930 -6045 0
 6041  6042  6043  930  6046 0

c  -1-1 --> -2
c    ( b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧  b^{2, 465}_0 ∧ -p_930) -> ( b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0)
c  in CNF:
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨  b^{2, 466}_2
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨  b^{2, 466}_1
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨  p_930 ∨ -b^{2, 466}_0
c  in DIMACS:
-6041  6042 -6043  930  6044 0
-6041  6042 -6043  930  6045 0
-6041  6042 -6043  930 -6046 0

c  -2-1 --> break 
c    ( b^{2, 465}_2 ∧  b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨  b^{2, 465}_0 ∨  p_930 ∨ break
c  in DIMACS:
-6041 -6042  6043  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 465}_2 ∧ -b^{2, 465}_1 ∧ -b^{2, 465}_0 ∧ true) 
c  in CNF:
c    -b^{2, 465}_2 ∨  b^{2, 465}_1 ∨  b^{2, 465}_0 ∨ false 
c  in DIMACS:
-6041  6042  6043  0

c  3 does not represent an automaton state.
c    -(-b^{2, 465}_2 ∧  b^{2, 465}_1 ∧  b^{2, 465}_0 ∧ true) 
c  in CNF:
c     b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ false 
c  in DIMACS:
 6041 -6042 -6043  0
c  -3 does not represent an automaton state.
c    -( b^{2, 465}_2 ∧  b^{2, 465}_1 ∧  b^{2, 465}_0 ∧ true) 
c  in CNF:
c    -b^{2, 465}_2 ∨ -b^{2, 465}_1 ∨ -b^{2, 465}_0 ∨ false 
c  in DIMACS:
-6041 -6042 -6043  0

c i = 466
c  -2+1 --> -1
c    ( b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧  p_932) -> ( b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0)
c  in CNF:
c    -b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨  b^{2, 467}_2
c    -b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_1
c    -b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨  b^{2, 467}_0
c  in DIMACS:
-6044 -6045  6046 -932  6047 0
-6044 -6045  6046 -932 -6048 0
-6044 -6045  6046 -932  6049 0

c  -1+1 --> 0
c    ( b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0 ∧  p_932) -> (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧ -b^{2, 467}_0)
c  in CNF:
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_2
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_1
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_0
c  in DIMACS:
-6044  6045 -6046 -932 -6047 0
-6044  6045 -6046 -932 -6048 0
-6044  6045 -6046 -932 -6049 0

c  0+1 --> 1
c    (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧  p_932) -> (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0)
c  in CNF:
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_2
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_1
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨  b^{2, 467}_0
c  in DIMACS:
 6044  6045  6046 -932 -6047 0
 6044  6045  6046 -932 -6048 0
 6044  6045  6046 -932  6049 0

c  1+1 --> 2
c    (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0 ∧  p_932) -> (-b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0)
c  in CNF:
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_2
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨  b^{2, 467}_1
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ -p_932 ∨ -b^{2, 467}_0
c  in DIMACS:
 6044  6045 -6046 -932 -6047 0
 6044  6045 -6046 -932  6048 0
 6044  6045 -6046 -932 -6049 0

c  2+1 --> break 
c    (-b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧  p_932) -> break
c  in CNF:
c     b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ -p_932 ∨ break
c  in DIMACS:
 6044 -6045  6046 -932 1162 0


c  2-1 --> 1
c    (-b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧ -p_932) -> (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0)
c  in CNF:
c     b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_2
c     b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_1
c     b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨  b^{2, 467}_0
c  in DIMACS:
 6044 -6045  6046  932 -6047 0
 6044 -6045  6046  932 -6048 0
 6044 -6045  6046  932  6049 0

c  1-1 --> 0
c    (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0 ∧ -p_932) -> (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧ -b^{2, 467}_0)
c  in CNF:
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_2
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_1
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_0
c  in DIMACS:
 6044  6045 -6046  932 -6047 0
 6044  6045 -6046  932 -6048 0
 6044  6045 -6046  932 -6049 0

c  0-1 --> -1
c    (-b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧ -p_932) -> ( b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0)
c  in CNF:
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨  b^{2, 467}_2
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_1
c     b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨  b^{2, 467}_0
c  in DIMACS:
 6044  6045  6046  932  6047 0
 6044  6045  6046  932 -6048 0
 6044  6045  6046  932  6049 0

c  -1-1 --> -2
c    ( b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧  b^{2, 466}_0 ∧ -p_932) -> ( b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0)
c  in CNF:
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨  b^{2, 467}_2
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨  b^{2, 467}_1
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨  p_932 ∨ -b^{2, 467}_0
c  in DIMACS:
-6044  6045 -6046  932  6047 0
-6044  6045 -6046  932  6048 0
-6044  6045 -6046  932 -6049 0

c  -2-1 --> break 
c    ( b^{2, 466}_2 ∧  b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧ -p_932) -> break
c  in CNF:
c    -b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨  b^{2, 466}_0 ∨  p_932 ∨ break
c  in DIMACS:
-6044 -6045  6046  932 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 466}_2 ∧ -b^{2, 466}_1 ∧ -b^{2, 466}_0 ∧ true) 
c  in CNF:
c    -b^{2, 466}_2 ∨  b^{2, 466}_1 ∨  b^{2, 466}_0 ∨ false 
c  in DIMACS:
-6044  6045  6046  0

c  3 does not represent an automaton state.
c    -(-b^{2, 466}_2 ∧  b^{2, 466}_1 ∧  b^{2, 466}_0 ∧ true) 
c  in CNF:
c     b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ false 
c  in DIMACS:
 6044 -6045 -6046  0
c  -3 does not represent an automaton state.
c    -( b^{2, 466}_2 ∧  b^{2, 466}_1 ∧  b^{2, 466}_0 ∧ true) 
c  in CNF:
c    -b^{2, 466}_2 ∨ -b^{2, 466}_1 ∨ -b^{2, 466}_0 ∨ false 
c  in DIMACS:
-6044 -6045 -6046  0

c i = 467
c  -2+1 --> -1
c    ( b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧  p_934) -> ( b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0)
c  in CNF:
c    -b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨  b^{2, 468}_2
c    -b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_1
c    -b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨  b^{2, 468}_0
c  in DIMACS:
-6047 -6048  6049 -934  6050 0
-6047 -6048  6049 -934 -6051 0
-6047 -6048  6049 -934  6052 0

c  -1+1 --> 0
c    ( b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0 ∧  p_934) -> (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧ -b^{2, 468}_0)
c  in CNF:
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_2
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_1
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_0
c  in DIMACS:
-6047  6048 -6049 -934 -6050 0
-6047  6048 -6049 -934 -6051 0
-6047  6048 -6049 -934 -6052 0

c  0+1 --> 1
c    (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧  p_934) -> (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0)
c  in CNF:
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_2
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_1
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨  b^{2, 468}_0
c  in DIMACS:
 6047  6048  6049 -934 -6050 0
 6047  6048  6049 -934 -6051 0
 6047  6048  6049 -934  6052 0

c  1+1 --> 2
c    (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0 ∧  p_934) -> (-b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0)
c  in CNF:
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_2
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨  b^{2, 468}_1
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ -p_934 ∨ -b^{2, 468}_0
c  in DIMACS:
 6047  6048 -6049 -934 -6050 0
 6047  6048 -6049 -934  6051 0
 6047  6048 -6049 -934 -6052 0

c  2+1 --> break 
c    (-b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧  p_934) -> break
c  in CNF:
c     b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ -p_934 ∨ break
c  in DIMACS:
 6047 -6048  6049 -934 1162 0


c  2-1 --> 1
c    (-b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧ -p_934) -> (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0)
c  in CNF:
c     b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_2
c     b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_1
c     b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨  b^{2, 468}_0
c  in DIMACS:
 6047 -6048  6049  934 -6050 0
 6047 -6048  6049  934 -6051 0
 6047 -6048  6049  934  6052 0

c  1-1 --> 0
c    (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0 ∧ -p_934) -> (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧ -b^{2, 468}_0)
c  in CNF:
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_2
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_1
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_0
c  in DIMACS:
 6047  6048 -6049  934 -6050 0
 6047  6048 -6049  934 -6051 0
 6047  6048 -6049  934 -6052 0

c  0-1 --> -1
c    (-b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧ -p_934) -> ( b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0)
c  in CNF:
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨  b^{2, 468}_2
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_1
c     b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨  b^{2, 468}_0
c  in DIMACS:
 6047  6048  6049  934  6050 0
 6047  6048  6049  934 -6051 0
 6047  6048  6049  934  6052 0

c  -1-1 --> -2
c    ( b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧  b^{2, 467}_0 ∧ -p_934) -> ( b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0)
c  in CNF:
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨  b^{2, 468}_2
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨  b^{2, 468}_1
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨  p_934 ∨ -b^{2, 468}_0
c  in DIMACS:
-6047  6048 -6049  934  6050 0
-6047  6048 -6049  934  6051 0
-6047  6048 -6049  934 -6052 0

c  -2-1 --> break 
c    ( b^{2, 467}_2 ∧  b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧ -p_934) -> break
c  in CNF:
c    -b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨  b^{2, 467}_0 ∨  p_934 ∨ break
c  in DIMACS:
-6047 -6048  6049  934 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 467}_2 ∧ -b^{2, 467}_1 ∧ -b^{2, 467}_0 ∧ true) 
c  in CNF:
c    -b^{2, 467}_2 ∨  b^{2, 467}_1 ∨  b^{2, 467}_0 ∨ false 
c  in DIMACS:
-6047  6048  6049  0

c  3 does not represent an automaton state.
c    -(-b^{2, 467}_2 ∧  b^{2, 467}_1 ∧  b^{2, 467}_0 ∧ true) 
c  in CNF:
c     b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ false 
c  in DIMACS:
 6047 -6048 -6049  0
c  -3 does not represent an automaton state.
c    -( b^{2, 467}_2 ∧  b^{2, 467}_1 ∧  b^{2, 467}_0 ∧ true) 
c  in CNF:
c    -b^{2, 467}_2 ∨ -b^{2, 467}_1 ∨ -b^{2, 467}_0 ∨ false 
c  in DIMACS:
-6047 -6048 -6049  0

c i = 468
c  -2+1 --> -1
c    ( b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧  p_936) -> ( b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0)
c  in CNF:
c    -b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨  b^{2, 469}_2
c    -b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_1
c    -b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨  b^{2, 469}_0
c  in DIMACS:
-6050 -6051  6052 -936  6053 0
-6050 -6051  6052 -936 -6054 0
-6050 -6051  6052 -936  6055 0

c  -1+1 --> 0
c    ( b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0 ∧  p_936) -> (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧ -b^{2, 469}_0)
c  in CNF:
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_2
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_1
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_0
c  in DIMACS:
-6050  6051 -6052 -936 -6053 0
-6050  6051 -6052 -936 -6054 0
-6050  6051 -6052 -936 -6055 0

c  0+1 --> 1
c    (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧  p_936) -> (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0)
c  in CNF:
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_2
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_1
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨  b^{2, 469}_0
c  in DIMACS:
 6050  6051  6052 -936 -6053 0
 6050  6051  6052 -936 -6054 0
 6050  6051  6052 -936  6055 0

c  1+1 --> 2
c    (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0 ∧  p_936) -> (-b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0)
c  in CNF:
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_2
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨  b^{2, 469}_1
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ -p_936 ∨ -b^{2, 469}_0
c  in DIMACS:
 6050  6051 -6052 -936 -6053 0
 6050  6051 -6052 -936  6054 0
 6050  6051 -6052 -936 -6055 0

c  2+1 --> break 
c    (-b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧  p_936) -> break
c  in CNF:
c     b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 6050 -6051  6052 -936 1162 0


c  2-1 --> 1
c    (-b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧ -p_936) -> (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0)
c  in CNF:
c     b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_2
c     b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_1
c     b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨  b^{2, 469}_0
c  in DIMACS:
 6050 -6051  6052  936 -6053 0
 6050 -6051  6052  936 -6054 0
 6050 -6051  6052  936  6055 0

c  1-1 --> 0
c    (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0 ∧ -p_936) -> (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧ -b^{2, 469}_0)
c  in CNF:
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_2
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_1
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_0
c  in DIMACS:
 6050  6051 -6052  936 -6053 0
 6050  6051 -6052  936 -6054 0
 6050  6051 -6052  936 -6055 0

c  0-1 --> -1
c    (-b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧ -p_936) -> ( b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0)
c  in CNF:
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨  b^{2, 469}_2
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_1
c     b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨  b^{2, 469}_0
c  in DIMACS:
 6050  6051  6052  936  6053 0
 6050  6051  6052  936 -6054 0
 6050  6051  6052  936  6055 0

c  -1-1 --> -2
c    ( b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧  b^{2, 468}_0 ∧ -p_936) -> ( b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0)
c  in CNF:
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨  b^{2, 469}_2
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨  b^{2, 469}_1
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨  p_936 ∨ -b^{2, 469}_0
c  in DIMACS:
-6050  6051 -6052  936  6053 0
-6050  6051 -6052  936  6054 0
-6050  6051 -6052  936 -6055 0

c  -2-1 --> break 
c    ( b^{2, 468}_2 ∧  b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨  b^{2, 468}_0 ∨  p_936 ∨ break
c  in DIMACS:
-6050 -6051  6052  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 468}_2 ∧ -b^{2, 468}_1 ∧ -b^{2, 468}_0 ∧ true) 
c  in CNF:
c    -b^{2, 468}_2 ∨  b^{2, 468}_1 ∨  b^{2, 468}_0 ∨ false 
c  in DIMACS:
-6050  6051  6052  0

c  3 does not represent an automaton state.
c    -(-b^{2, 468}_2 ∧  b^{2, 468}_1 ∧  b^{2, 468}_0 ∧ true) 
c  in CNF:
c     b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ false 
c  in DIMACS:
 6050 -6051 -6052  0
c  -3 does not represent an automaton state.
c    -( b^{2, 468}_2 ∧  b^{2, 468}_1 ∧  b^{2, 468}_0 ∧ true) 
c  in CNF:
c    -b^{2, 468}_2 ∨ -b^{2, 468}_1 ∨ -b^{2, 468}_0 ∨ false 
c  in DIMACS:
-6050 -6051 -6052  0

c i = 469
c  -2+1 --> -1
c    ( b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧  p_938) -> ( b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0)
c  in CNF:
c    -b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨  b^{2, 470}_2
c    -b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_1
c    -b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨  b^{2, 470}_0
c  in DIMACS:
-6053 -6054  6055 -938  6056 0
-6053 -6054  6055 -938 -6057 0
-6053 -6054  6055 -938  6058 0

c  -1+1 --> 0
c    ( b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0 ∧  p_938) -> (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧ -b^{2, 470}_0)
c  in CNF:
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_2
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_1
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_0
c  in DIMACS:
-6053  6054 -6055 -938 -6056 0
-6053  6054 -6055 -938 -6057 0
-6053  6054 -6055 -938 -6058 0

c  0+1 --> 1
c    (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧  p_938) -> (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0)
c  in CNF:
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_2
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_1
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨  b^{2, 470}_0
c  in DIMACS:
 6053  6054  6055 -938 -6056 0
 6053  6054  6055 -938 -6057 0
 6053  6054  6055 -938  6058 0

c  1+1 --> 2
c    (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0 ∧  p_938) -> (-b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0)
c  in CNF:
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_2
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨  b^{2, 470}_1
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ -p_938 ∨ -b^{2, 470}_0
c  in DIMACS:
 6053  6054 -6055 -938 -6056 0
 6053  6054 -6055 -938  6057 0
 6053  6054 -6055 -938 -6058 0

c  2+1 --> break 
c    (-b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧  p_938) -> break
c  in CNF:
c     b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 6053 -6054  6055 -938 1162 0


c  2-1 --> 1
c    (-b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧ -p_938) -> (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0)
c  in CNF:
c     b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_2
c     b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_1
c     b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨  b^{2, 470}_0
c  in DIMACS:
 6053 -6054  6055  938 -6056 0
 6053 -6054  6055  938 -6057 0
 6053 -6054  6055  938  6058 0

c  1-1 --> 0
c    (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0 ∧ -p_938) -> (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧ -b^{2, 470}_0)
c  in CNF:
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_2
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_1
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_0
c  in DIMACS:
 6053  6054 -6055  938 -6056 0
 6053  6054 -6055  938 -6057 0
 6053  6054 -6055  938 -6058 0

c  0-1 --> -1
c    (-b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧ -p_938) -> ( b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0)
c  in CNF:
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨  b^{2, 470}_2
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_1
c     b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨  b^{2, 470}_0
c  in DIMACS:
 6053  6054  6055  938  6056 0
 6053  6054  6055  938 -6057 0
 6053  6054  6055  938  6058 0

c  -1-1 --> -2
c    ( b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧  b^{2, 469}_0 ∧ -p_938) -> ( b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0)
c  in CNF:
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨  b^{2, 470}_2
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨  b^{2, 470}_1
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨  p_938 ∨ -b^{2, 470}_0
c  in DIMACS:
-6053  6054 -6055  938  6056 0
-6053  6054 -6055  938  6057 0
-6053  6054 -6055  938 -6058 0

c  -2-1 --> break 
c    ( b^{2, 469}_2 ∧  b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨  b^{2, 469}_0 ∨  p_938 ∨ break
c  in DIMACS:
-6053 -6054  6055  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 469}_2 ∧ -b^{2, 469}_1 ∧ -b^{2, 469}_0 ∧ true) 
c  in CNF:
c    -b^{2, 469}_2 ∨  b^{2, 469}_1 ∨  b^{2, 469}_0 ∨ false 
c  in DIMACS:
-6053  6054  6055  0

c  3 does not represent an automaton state.
c    -(-b^{2, 469}_2 ∧  b^{2, 469}_1 ∧  b^{2, 469}_0 ∧ true) 
c  in CNF:
c     b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ false 
c  in DIMACS:
 6053 -6054 -6055  0
c  -3 does not represent an automaton state.
c    -( b^{2, 469}_2 ∧  b^{2, 469}_1 ∧  b^{2, 469}_0 ∧ true) 
c  in CNF:
c    -b^{2, 469}_2 ∨ -b^{2, 469}_1 ∨ -b^{2, 469}_0 ∨ false 
c  in DIMACS:
-6053 -6054 -6055  0

c i = 470
c  -2+1 --> -1
c    ( b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧  p_940) -> ( b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0)
c  in CNF:
c    -b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨  b^{2, 471}_2
c    -b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_1
c    -b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨  b^{2, 471}_0
c  in DIMACS:
-6056 -6057  6058 -940  6059 0
-6056 -6057  6058 -940 -6060 0
-6056 -6057  6058 -940  6061 0

c  -1+1 --> 0
c    ( b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0 ∧  p_940) -> (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧ -b^{2, 471}_0)
c  in CNF:
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_2
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_1
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_0
c  in DIMACS:
-6056  6057 -6058 -940 -6059 0
-6056  6057 -6058 -940 -6060 0
-6056  6057 -6058 -940 -6061 0

c  0+1 --> 1
c    (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧  p_940) -> (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0)
c  in CNF:
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_2
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_1
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨  b^{2, 471}_0
c  in DIMACS:
 6056  6057  6058 -940 -6059 0
 6056  6057  6058 -940 -6060 0
 6056  6057  6058 -940  6061 0

c  1+1 --> 2
c    (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0 ∧  p_940) -> (-b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0)
c  in CNF:
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_2
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨  b^{2, 471}_1
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ -p_940 ∨ -b^{2, 471}_0
c  in DIMACS:
 6056  6057 -6058 -940 -6059 0
 6056  6057 -6058 -940  6060 0
 6056  6057 -6058 -940 -6061 0

c  2+1 --> break 
c    (-b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧  p_940) -> break
c  in CNF:
c     b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 6056 -6057  6058 -940 1162 0


c  2-1 --> 1
c    (-b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧ -p_940) -> (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0)
c  in CNF:
c     b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_2
c     b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_1
c     b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨  b^{2, 471}_0
c  in DIMACS:
 6056 -6057  6058  940 -6059 0
 6056 -6057  6058  940 -6060 0
 6056 -6057  6058  940  6061 0

c  1-1 --> 0
c    (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0 ∧ -p_940) -> (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧ -b^{2, 471}_0)
c  in CNF:
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_2
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_1
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_0
c  in DIMACS:
 6056  6057 -6058  940 -6059 0
 6056  6057 -6058  940 -6060 0
 6056  6057 -6058  940 -6061 0

c  0-1 --> -1
c    (-b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧ -p_940) -> ( b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0)
c  in CNF:
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨  b^{2, 471}_2
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_1
c     b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨  b^{2, 471}_0
c  in DIMACS:
 6056  6057  6058  940  6059 0
 6056  6057  6058  940 -6060 0
 6056  6057  6058  940  6061 0

c  -1-1 --> -2
c    ( b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧  b^{2, 470}_0 ∧ -p_940) -> ( b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0)
c  in CNF:
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨  b^{2, 471}_2
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨  b^{2, 471}_1
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨  p_940 ∨ -b^{2, 471}_0
c  in DIMACS:
-6056  6057 -6058  940  6059 0
-6056  6057 -6058  940  6060 0
-6056  6057 -6058  940 -6061 0

c  -2-1 --> break 
c    ( b^{2, 470}_2 ∧  b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨  b^{2, 470}_0 ∨  p_940 ∨ break
c  in DIMACS:
-6056 -6057  6058  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 470}_2 ∧ -b^{2, 470}_1 ∧ -b^{2, 470}_0 ∧ true) 
c  in CNF:
c    -b^{2, 470}_2 ∨  b^{2, 470}_1 ∨  b^{2, 470}_0 ∨ false 
c  in DIMACS:
-6056  6057  6058  0

c  3 does not represent an automaton state.
c    -(-b^{2, 470}_2 ∧  b^{2, 470}_1 ∧  b^{2, 470}_0 ∧ true) 
c  in CNF:
c     b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ false 
c  in DIMACS:
 6056 -6057 -6058  0
c  -3 does not represent an automaton state.
c    -( b^{2, 470}_2 ∧  b^{2, 470}_1 ∧  b^{2, 470}_0 ∧ true) 
c  in CNF:
c    -b^{2, 470}_2 ∨ -b^{2, 470}_1 ∨ -b^{2, 470}_0 ∨ false 
c  in DIMACS:
-6056 -6057 -6058  0

c i = 471
c  -2+1 --> -1
c    ( b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧  p_942) -> ( b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0)
c  in CNF:
c    -b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨  b^{2, 472}_2
c    -b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_1
c    -b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨  b^{2, 472}_0
c  in DIMACS:
-6059 -6060  6061 -942  6062 0
-6059 -6060  6061 -942 -6063 0
-6059 -6060  6061 -942  6064 0

c  -1+1 --> 0
c    ( b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0 ∧  p_942) -> (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧ -b^{2, 472}_0)
c  in CNF:
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_2
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_1
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_0
c  in DIMACS:
-6059  6060 -6061 -942 -6062 0
-6059  6060 -6061 -942 -6063 0
-6059  6060 -6061 -942 -6064 0

c  0+1 --> 1
c    (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧  p_942) -> (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0)
c  in CNF:
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_2
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_1
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨  b^{2, 472}_0
c  in DIMACS:
 6059  6060  6061 -942 -6062 0
 6059  6060  6061 -942 -6063 0
 6059  6060  6061 -942  6064 0

c  1+1 --> 2
c    (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0 ∧  p_942) -> (-b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0)
c  in CNF:
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_2
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨  b^{2, 472}_1
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ -p_942 ∨ -b^{2, 472}_0
c  in DIMACS:
 6059  6060 -6061 -942 -6062 0
 6059  6060 -6061 -942  6063 0
 6059  6060 -6061 -942 -6064 0

c  2+1 --> break 
c    (-b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧  p_942) -> break
c  in CNF:
c     b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 6059 -6060  6061 -942 1162 0


c  2-1 --> 1
c    (-b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧ -p_942) -> (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0)
c  in CNF:
c     b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_2
c     b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_1
c     b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨  b^{2, 472}_0
c  in DIMACS:
 6059 -6060  6061  942 -6062 0
 6059 -6060  6061  942 -6063 0
 6059 -6060  6061  942  6064 0

c  1-1 --> 0
c    (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0 ∧ -p_942) -> (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧ -b^{2, 472}_0)
c  in CNF:
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_2
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_1
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_0
c  in DIMACS:
 6059  6060 -6061  942 -6062 0
 6059  6060 -6061  942 -6063 0
 6059  6060 -6061  942 -6064 0

c  0-1 --> -1
c    (-b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧ -p_942) -> ( b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0)
c  in CNF:
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨  b^{2, 472}_2
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_1
c     b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨  b^{2, 472}_0
c  in DIMACS:
 6059  6060  6061  942  6062 0
 6059  6060  6061  942 -6063 0
 6059  6060  6061  942  6064 0

c  -1-1 --> -2
c    ( b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧  b^{2, 471}_0 ∧ -p_942) -> ( b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0)
c  in CNF:
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨  b^{2, 472}_2
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨  b^{2, 472}_1
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨  p_942 ∨ -b^{2, 472}_0
c  in DIMACS:
-6059  6060 -6061  942  6062 0
-6059  6060 -6061  942  6063 0
-6059  6060 -6061  942 -6064 0

c  -2-1 --> break 
c    ( b^{2, 471}_2 ∧  b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨  b^{2, 471}_0 ∨  p_942 ∨ break
c  in DIMACS:
-6059 -6060  6061  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 471}_2 ∧ -b^{2, 471}_1 ∧ -b^{2, 471}_0 ∧ true) 
c  in CNF:
c    -b^{2, 471}_2 ∨  b^{2, 471}_1 ∨  b^{2, 471}_0 ∨ false 
c  in DIMACS:
-6059  6060  6061  0

c  3 does not represent an automaton state.
c    -(-b^{2, 471}_2 ∧  b^{2, 471}_1 ∧  b^{2, 471}_0 ∧ true) 
c  in CNF:
c     b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ false 
c  in DIMACS:
 6059 -6060 -6061  0
c  -3 does not represent an automaton state.
c    -( b^{2, 471}_2 ∧  b^{2, 471}_1 ∧  b^{2, 471}_0 ∧ true) 
c  in CNF:
c    -b^{2, 471}_2 ∨ -b^{2, 471}_1 ∨ -b^{2, 471}_0 ∨ false 
c  in DIMACS:
-6059 -6060 -6061  0

c i = 472
c  -2+1 --> -1
c    ( b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧  p_944) -> ( b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0)
c  in CNF:
c    -b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨  b^{2, 473}_2
c    -b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_1
c    -b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨  b^{2, 473}_0
c  in DIMACS:
-6062 -6063  6064 -944  6065 0
-6062 -6063  6064 -944 -6066 0
-6062 -6063  6064 -944  6067 0

c  -1+1 --> 0
c    ( b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0 ∧  p_944) -> (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧ -b^{2, 473}_0)
c  in CNF:
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_2
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_1
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_0
c  in DIMACS:
-6062  6063 -6064 -944 -6065 0
-6062  6063 -6064 -944 -6066 0
-6062  6063 -6064 -944 -6067 0

c  0+1 --> 1
c    (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧  p_944) -> (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0)
c  in CNF:
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_2
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_1
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨  b^{2, 473}_0
c  in DIMACS:
 6062  6063  6064 -944 -6065 0
 6062  6063  6064 -944 -6066 0
 6062  6063  6064 -944  6067 0

c  1+1 --> 2
c    (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0 ∧  p_944) -> (-b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0)
c  in CNF:
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_2
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨  b^{2, 473}_1
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ -p_944 ∨ -b^{2, 473}_0
c  in DIMACS:
 6062  6063 -6064 -944 -6065 0
 6062  6063 -6064 -944  6066 0
 6062  6063 -6064 -944 -6067 0

c  2+1 --> break 
c    (-b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧  p_944) -> break
c  in CNF:
c     b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 6062 -6063  6064 -944 1162 0


c  2-1 --> 1
c    (-b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧ -p_944) -> (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0)
c  in CNF:
c     b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_2
c     b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_1
c     b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨  b^{2, 473}_0
c  in DIMACS:
 6062 -6063  6064  944 -6065 0
 6062 -6063  6064  944 -6066 0
 6062 -6063  6064  944  6067 0

c  1-1 --> 0
c    (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0 ∧ -p_944) -> (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧ -b^{2, 473}_0)
c  in CNF:
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_2
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_1
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_0
c  in DIMACS:
 6062  6063 -6064  944 -6065 0
 6062  6063 -6064  944 -6066 0
 6062  6063 -6064  944 -6067 0

c  0-1 --> -1
c    (-b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧ -p_944) -> ( b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0)
c  in CNF:
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨  b^{2, 473}_2
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_1
c     b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨  b^{2, 473}_0
c  in DIMACS:
 6062  6063  6064  944  6065 0
 6062  6063  6064  944 -6066 0
 6062  6063  6064  944  6067 0

c  -1-1 --> -2
c    ( b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧  b^{2, 472}_0 ∧ -p_944) -> ( b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0)
c  in CNF:
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨  b^{2, 473}_2
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨  b^{2, 473}_1
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨  p_944 ∨ -b^{2, 473}_0
c  in DIMACS:
-6062  6063 -6064  944  6065 0
-6062  6063 -6064  944  6066 0
-6062  6063 -6064  944 -6067 0

c  -2-1 --> break 
c    ( b^{2, 472}_2 ∧  b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨  b^{2, 472}_0 ∨  p_944 ∨ break
c  in DIMACS:
-6062 -6063  6064  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 472}_2 ∧ -b^{2, 472}_1 ∧ -b^{2, 472}_0 ∧ true) 
c  in CNF:
c    -b^{2, 472}_2 ∨  b^{2, 472}_1 ∨  b^{2, 472}_0 ∨ false 
c  in DIMACS:
-6062  6063  6064  0

c  3 does not represent an automaton state.
c    -(-b^{2, 472}_2 ∧  b^{2, 472}_1 ∧  b^{2, 472}_0 ∧ true) 
c  in CNF:
c     b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ false 
c  in DIMACS:
 6062 -6063 -6064  0
c  -3 does not represent an automaton state.
c    -( b^{2, 472}_2 ∧  b^{2, 472}_1 ∧  b^{2, 472}_0 ∧ true) 
c  in CNF:
c    -b^{2, 472}_2 ∨ -b^{2, 472}_1 ∨ -b^{2, 472}_0 ∨ false 
c  in DIMACS:
-6062 -6063 -6064  0

c i = 473
c  -2+1 --> -1
c    ( b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧  p_946) -> ( b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0)
c  in CNF:
c    -b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨  b^{2, 474}_2
c    -b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_1
c    -b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨  b^{2, 474}_0
c  in DIMACS:
-6065 -6066  6067 -946  6068 0
-6065 -6066  6067 -946 -6069 0
-6065 -6066  6067 -946  6070 0

c  -1+1 --> 0
c    ( b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0 ∧  p_946) -> (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧ -b^{2, 474}_0)
c  in CNF:
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_2
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_1
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_0
c  in DIMACS:
-6065  6066 -6067 -946 -6068 0
-6065  6066 -6067 -946 -6069 0
-6065  6066 -6067 -946 -6070 0

c  0+1 --> 1
c    (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧  p_946) -> (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0)
c  in CNF:
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_2
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_1
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨  b^{2, 474}_0
c  in DIMACS:
 6065  6066  6067 -946 -6068 0
 6065  6066  6067 -946 -6069 0
 6065  6066  6067 -946  6070 0

c  1+1 --> 2
c    (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0 ∧  p_946) -> (-b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0)
c  in CNF:
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_2
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨  b^{2, 474}_1
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ -p_946 ∨ -b^{2, 474}_0
c  in DIMACS:
 6065  6066 -6067 -946 -6068 0
 6065  6066 -6067 -946  6069 0
 6065  6066 -6067 -946 -6070 0

c  2+1 --> break 
c    (-b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧  p_946) -> break
c  in CNF:
c     b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 6065 -6066  6067 -946 1162 0


c  2-1 --> 1
c    (-b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧ -p_946) -> (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0)
c  in CNF:
c     b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_2
c     b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_1
c     b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨  b^{2, 474}_0
c  in DIMACS:
 6065 -6066  6067  946 -6068 0
 6065 -6066  6067  946 -6069 0
 6065 -6066  6067  946  6070 0

c  1-1 --> 0
c    (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0 ∧ -p_946) -> (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧ -b^{2, 474}_0)
c  in CNF:
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_2
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_1
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_0
c  in DIMACS:
 6065  6066 -6067  946 -6068 0
 6065  6066 -6067  946 -6069 0
 6065  6066 -6067  946 -6070 0

c  0-1 --> -1
c    (-b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧ -p_946) -> ( b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0)
c  in CNF:
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨  b^{2, 474}_2
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_1
c     b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨  b^{2, 474}_0
c  in DIMACS:
 6065  6066  6067  946  6068 0
 6065  6066  6067  946 -6069 0
 6065  6066  6067  946  6070 0

c  -1-1 --> -2
c    ( b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧  b^{2, 473}_0 ∧ -p_946) -> ( b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0)
c  in CNF:
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨  b^{2, 474}_2
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨  b^{2, 474}_1
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨  p_946 ∨ -b^{2, 474}_0
c  in DIMACS:
-6065  6066 -6067  946  6068 0
-6065  6066 -6067  946  6069 0
-6065  6066 -6067  946 -6070 0

c  -2-1 --> break 
c    ( b^{2, 473}_2 ∧  b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨  b^{2, 473}_0 ∨  p_946 ∨ break
c  in DIMACS:
-6065 -6066  6067  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 473}_2 ∧ -b^{2, 473}_1 ∧ -b^{2, 473}_0 ∧ true) 
c  in CNF:
c    -b^{2, 473}_2 ∨  b^{2, 473}_1 ∨  b^{2, 473}_0 ∨ false 
c  in DIMACS:
-6065  6066  6067  0

c  3 does not represent an automaton state.
c    -(-b^{2, 473}_2 ∧  b^{2, 473}_1 ∧  b^{2, 473}_0 ∧ true) 
c  in CNF:
c     b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ false 
c  in DIMACS:
 6065 -6066 -6067  0
c  -3 does not represent an automaton state.
c    -( b^{2, 473}_2 ∧  b^{2, 473}_1 ∧  b^{2, 473}_0 ∧ true) 
c  in CNF:
c    -b^{2, 473}_2 ∨ -b^{2, 473}_1 ∨ -b^{2, 473}_0 ∨ false 
c  in DIMACS:
-6065 -6066 -6067  0

c i = 474
c  -2+1 --> -1
c    ( b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧  p_948) -> ( b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0)
c  in CNF:
c    -b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨  b^{2, 475}_2
c    -b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_1
c    -b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨  b^{2, 475}_0
c  in DIMACS:
-6068 -6069  6070 -948  6071 0
-6068 -6069  6070 -948 -6072 0
-6068 -6069  6070 -948  6073 0

c  -1+1 --> 0
c    ( b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0 ∧  p_948) -> (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧ -b^{2, 475}_0)
c  in CNF:
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_2
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_1
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_0
c  in DIMACS:
-6068  6069 -6070 -948 -6071 0
-6068  6069 -6070 -948 -6072 0
-6068  6069 -6070 -948 -6073 0

c  0+1 --> 1
c    (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧  p_948) -> (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0)
c  in CNF:
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_2
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_1
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨  b^{2, 475}_0
c  in DIMACS:
 6068  6069  6070 -948 -6071 0
 6068  6069  6070 -948 -6072 0
 6068  6069  6070 -948  6073 0

c  1+1 --> 2
c    (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0 ∧  p_948) -> (-b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0)
c  in CNF:
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_2
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨  b^{2, 475}_1
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ -p_948 ∨ -b^{2, 475}_0
c  in DIMACS:
 6068  6069 -6070 -948 -6071 0
 6068  6069 -6070 -948  6072 0
 6068  6069 -6070 -948 -6073 0

c  2+1 --> break 
c    (-b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧  p_948) -> break
c  in CNF:
c     b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 6068 -6069  6070 -948 1162 0


c  2-1 --> 1
c    (-b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧ -p_948) -> (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0)
c  in CNF:
c     b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_2
c     b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_1
c     b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨  b^{2, 475}_0
c  in DIMACS:
 6068 -6069  6070  948 -6071 0
 6068 -6069  6070  948 -6072 0
 6068 -6069  6070  948  6073 0

c  1-1 --> 0
c    (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0 ∧ -p_948) -> (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧ -b^{2, 475}_0)
c  in CNF:
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_2
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_1
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_0
c  in DIMACS:
 6068  6069 -6070  948 -6071 0
 6068  6069 -6070  948 -6072 0
 6068  6069 -6070  948 -6073 0

c  0-1 --> -1
c    (-b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧ -p_948) -> ( b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0)
c  in CNF:
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨  b^{2, 475}_2
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_1
c     b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨  b^{2, 475}_0
c  in DIMACS:
 6068  6069  6070  948  6071 0
 6068  6069  6070  948 -6072 0
 6068  6069  6070  948  6073 0

c  -1-1 --> -2
c    ( b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧  b^{2, 474}_0 ∧ -p_948) -> ( b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0)
c  in CNF:
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨  b^{2, 475}_2
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨  b^{2, 475}_1
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨  p_948 ∨ -b^{2, 475}_0
c  in DIMACS:
-6068  6069 -6070  948  6071 0
-6068  6069 -6070  948  6072 0
-6068  6069 -6070  948 -6073 0

c  -2-1 --> break 
c    ( b^{2, 474}_2 ∧  b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨  b^{2, 474}_0 ∨  p_948 ∨ break
c  in DIMACS:
-6068 -6069  6070  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 474}_2 ∧ -b^{2, 474}_1 ∧ -b^{2, 474}_0 ∧ true) 
c  in CNF:
c    -b^{2, 474}_2 ∨  b^{2, 474}_1 ∨  b^{2, 474}_0 ∨ false 
c  in DIMACS:
-6068  6069  6070  0

c  3 does not represent an automaton state.
c    -(-b^{2, 474}_2 ∧  b^{2, 474}_1 ∧  b^{2, 474}_0 ∧ true) 
c  in CNF:
c     b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ false 
c  in DIMACS:
 6068 -6069 -6070  0
c  -3 does not represent an automaton state.
c    -( b^{2, 474}_2 ∧  b^{2, 474}_1 ∧  b^{2, 474}_0 ∧ true) 
c  in CNF:
c    -b^{2, 474}_2 ∨ -b^{2, 474}_1 ∨ -b^{2, 474}_0 ∨ false 
c  in DIMACS:
-6068 -6069 -6070  0

c i = 475
c  -2+1 --> -1
c    ( b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧  p_950) -> ( b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0)
c  in CNF:
c    -b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨  b^{2, 476}_2
c    -b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_1
c    -b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨  b^{2, 476}_0
c  in DIMACS:
-6071 -6072  6073 -950  6074 0
-6071 -6072  6073 -950 -6075 0
-6071 -6072  6073 -950  6076 0

c  -1+1 --> 0
c    ( b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0 ∧  p_950) -> (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧ -b^{2, 476}_0)
c  in CNF:
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_2
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_1
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_0
c  in DIMACS:
-6071  6072 -6073 -950 -6074 0
-6071  6072 -6073 -950 -6075 0
-6071  6072 -6073 -950 -6076 0

c  0+1 --> 1
c    (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧  p_950) -> (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0)
c  in CNF:
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_2
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_1
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨  b^{2, 476}_0
c  in DIMACS:
 6071  6072  6073 -950 -6074 0
 6071  6072  6073 -950 -6075 0
 6071  6072  6073 -950  6076 0

c  1+1 --> 2
c    (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0 ∧  p_950) -> (-b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0)
c  in CNF:
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_2
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨  b^{2, 476}_1
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ -p_950 ∨ -b^{2, 476}_0
c  in DIMACS:
 6071  6072 -6073 -950 -6074 0
 6071  6072 -6073 -950  6075 0
 6071  6072 -6073 -950 -6076 0

c  2+1 --> break 
c    (-b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧  p_950) -> break
c  in CNF:
c     b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 6071 -6072  6073 -950 1162 0


c  2-1 --> 1
c    (-b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧ -p_950) -> (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0)
c  in CNF:
c     b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_2
c     b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_1
c     b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨  b^{2, 476}_0
c  in DIMACS:
 6071 -6072  6073  950 -6074 0
 6071 -6072  6073  950 -6075 0
 6071 -6072  6073  950  6076 0

c  1-1 --> 0
c    (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0 ∧ -p_950) -> (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧ -b^{2, 476}_0)
c  in CNF:
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_2
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_1
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_0
c  in DIMACS:
 6071  6072 -6073  950 -6074 0
 6071  6072 -6073  950 -6075 0
 6071  6072 -6073  950 -6076 0

c  0-1 --> -1
c    (-b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧ -p_950) -> ( b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0)
c  in CNF:
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨  b^{2, 476}_2
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_1
c     b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨  b^{2, 476}_0
c  in DIMACS:
 6071  6072  6073  950  6074 0
 6071  6072  6073  950 -6075 0
 6071  6072  6073  950  6076 0

c  -1-1 --> -2
c    ( b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧  b^{2, 475}_0 ∧ -p_950) -> ( b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0)
c  in CNF:
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨  b^{2, 476}_2
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨  b^{2, 476}_1
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨  p_950 ∨ -b^{2, 476}_0
c  in DIMACS:
-6071  6072 -6073  950  6074 0
-6071  6072 -6073  950  6075 0
-6071  6072 -6073  950 -6076 0

c  -2-1 --> break 
c    ( b^{2, 475}_2 ∧  b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨  b^{2, 475}_0 ∨  p_950 ∨ break
c  in DIMACS:
-6071 -6072  6073  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 475}_2 ∧ -b^{2, 475}_1 ∧ -b^{2, 475}_0 ∧ true) 
c  in CNF:
c    -b^{2, 475}_2 ∨  b^{2, 475}_1 ∨  b^{2, 475}_0 ∨ false 
c  in DIMACS:
-6071  6072  6073  0

c  3 does not represent an automaton state.
c    -(-b^{2, 475}_2 ∧  b^{2, 475}_1 ∧  b^{2, 475}_0 ∧ true) 
c  in CNF:
c     b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ false 
c  in DIMACS:
 6071 -6072 -6073  0
c  -3 does not represent an automaton state.
c    -( b^{2, 475}_2 ∧  b^{2, 475}_1 ∧  b^{2, 475}_0 ∧ true) 
c  in CNF:
c    -b^{2, 475}_2 ∨ -b^{2, 475}_1 ∨ -b^{2, 475}_0 ∨ false 
c  in DIMACS:
-6071 -6072 -6073  0

c i = 476
c  -2+1 --> -1
c    ( b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧  p_952) -> ( b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0)
c  in CNF:
c    -b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨  b^{2, 477}_2
c    -b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_1
c    -b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨  b^{2, 477}_0
c  in DIMACS:
-6074 -6075  6076 -952  6077 0
-6074 -6075  6076 -952 -6078 0
-6074 -6075  6076 -952  6079 0

c  -1+1 --> 0
c    ( b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0 ∧  p_952) -> (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧ -b^{2, 477}_0)
c  in CNF:
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_2
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_1
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_0
c  in DIMACS:
-6074  6075 -6076 -952 -6077 0
-6074  6075 -6076 -952 -6078 0
-6074  6075 -6076 -952 -6079 0

c  0+1 --> 1
c    (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧  p_952) -> (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0)
c  in CNF:
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_2
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_1
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨  b^{2, 477}_0
c  in DIMACS:
 6074  6075  6076 -952 -6077 0
 6074  6075  6076 -952 -6078 0
 6074  6075  6076 -952  6079 0

c  1+1 --> 2
c    (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0 ∧  p_952) -> (-b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0)
c  in CNF:
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_2
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨  b^{2, 477}_1
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ -p_952 ∨ -b^{2, 477}_0
c  in DIMACS:
 6074  6075 -6076 -952 -6077 0
 6074  6075 -6076 -952  6078 0
 6074  6075 -6076 -952 -6079 0

c  2+1 --> break 
c    (-b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧  p_952) -> break
c  in CNF:
c     b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 6074 -6075  6076 -952 1162 0


c  2-1 --> 1
c    (-b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧ -p_952) -> (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0)
c  in CNF:
c     b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_2
c     b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_1
c     b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨  b^{2, 477}_0
c  in DIMACS:
 6074 -6075  6076  952 -6077 0
 6074 -6075  6076  952 -6078 0
 6074 -6075  6076  952  6079 0

c  1-1 --> 0
c    (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0 ∧ -p_952) -> (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧ -b^{2, 477}_0)
c  in CNF:
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_2
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_1
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_0
c  in DIMACS:
 6074  6075 -6076  952 -6077 0
 6074  6075 -6076  952 -6078 0
 6074  6075 -6076  952 -6079 0

c  0-1 --> -1
c    (-b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧ -p_952) -> ( b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0)
c  in CNF:
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨  b^{2, 477}_2
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_1
c     b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨  b^{2, 477}_0
c  in DIMACS:
 6074  6075  6076  952  6077 0
 6074  6075  6076  952 -6078 0
 6074  6075  6076  952  6079 0

c  -1-1 --> -2
c    ( b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧  b^{2, 476}_0 ∧ -p_952) -> ( b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0)
c  in CNF:
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨  b^{2, 477}_2
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨  b^{2, 477}_1
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨  p_952 ∨ -b^{2, 477}_0
c  in DIMACS:
-6074  6075 -6076  952  6077 0
-6074  6075 -6076  952  6078 0
-6074  6075 -6076  952 -6079 0

c  -2-1 --> break 
c    ( b^{2, 476}_2 ∧  b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨  b^{2, 476}_0 ∨  p_952 ∨ break
c  in DIMACS:
-6074 -6075  6076  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 476}_2 ∧ -b^{2, 476}_1 ∧ -b^{2, 476}_0 ∧ true) 
c  in CNF:
c    -b^{2, 476}_2 ∨  b^{2, 476}_1 ∨  b^{2, 476}_0 ∨ false 
c  in DIMACS:
-6074  6075  6076  0

c  3 does not represent an automaton state.
c    -(-b^{2, 476}_2 ∧  b^{2, 476}_1 ∧  b^{2, 476}_0 ∧ true) 
c  in CNF:
c     b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ false 
c  in DIMACS:
 6074 -6075 -6076  0
c  -3 does not represent an automaton state.
c    -( b^{2, 476}_2 ∧  b^{2, 476}_1 ∧  b^{2, 476}_0 ∧ true) 
c  in CNF:
c    -b^{2, 476}_2 ∨ -b^{2, 476}_1 ∨ -b^{2, 476}_0 ∨ false 
c  in DIMACS:
-6074 -6075 -6076  0

c i = 477
c  -2+1 --> -1
c    ( b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧  p_954) -> ( b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0)
c  in CNF:
c    -b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨  b^{2, 478}_2
c    -b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_1
c    -b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨  b^{2, 478}_0
c  in DIMACS:
-6077 -6078  6079 -954  6080 0
-6077 -6078  6079 -954 -6081 0
-6077 -6078  6079 -954  6082 0

c  -1+1 --> 0
c    ( b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0 ∧  p_954) -> (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧ -b^{2, 478}_0)
c  in CNF:
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_2
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_1
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_0
c  in DIMACS:
-6077  6078 -6079 -954 -6080 0
-6077  6078 -6079 -954 -6081 0
-6077  6078 -6079 -954 -6082 0

c  0+1 --> 1
c    (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧  p_954) -> (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0)
c  in CNF:
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_2
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_1
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨  b^{2, 478}_0
c  in DIMACS:
 6077  6078  6079 -954 -6080 0
 6077  6078  6079 -954 -6081 0
 6077  6078  6079 -954  6082 0

c  1+1 --> 2
c    (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0 ∧  p_954) -> (-b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0)
c  in CNF:
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_2
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨  b^{2, 478}_1
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ -p_954 ∨ -b^{2, 478}_0
c  in DIMACS:
 6077  6078 -6079 -954 -6080 0
 6077  6078 -6079 -954  6081 0
 6077  6078 -6079 -954 -6082 0

c  2+1 --> break 
c    (-b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧  p_954) -> break
c  in CNF:
c     b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 6077 -6078  6079 -954 1162 0


c  2-1 --> 1
c    (-b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧ -p_954) -> (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0)
c  in CNF:
c     b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_2
c     b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_1
c     b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨  b^{2, 478}_0
c  in DIMACS:
 6077 -6078  6079  954 -6080 0
 6077 -6078  6079  954 -6081 0
 6077 -6078  6079  954  6082 0

c  1-1 --> 0
c    (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0 ∧ -p_954) -> (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧ -b^{2, 478}_0)
c  in CNF:
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_2
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_1
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_0
c  in DIMACS:
 6077  6078 -6079  954 -6080 0
 6077  6078 -6079  954 -6081 0
 6077  6078 -6079  954 -6082 0

c  0-1 --> -1
c    (-b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧ -p_954) -> ( b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0)
c  in CNF:
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨  b^{2, 478}_2
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_1
c     b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨  b^{2, 478}_0
c  in DIMACS:
 6077  6078  6079  954  6080 0
 6077  6078  6079  954 -6081 0
 6077  6078  6079  954  6082 0

c  -1-1 --> -2
c    ( b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧  b^{2, 477}_0 ∧ -p_954) -> ( b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0)
c  in CNF:
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨  b^{2, 478}_2
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨  b^{2, 478}_1
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨  p_954 ∨ -b^{2, 478}_0
c  in DIMACS:
-6077  6078 -6079  954  6080 0
-6077  6078 -6079  954  6081 0
-6077  6078 -6079  954 -6082 0

c  -2-1 --> break 
c    ( b^{2, 477}_2 ∧  b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨  b^{2, 477}_0 ∨  p_954 ∨ break
c  in DIMACS:
-6077 -6078  6079  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 477}_2 ∧ -b^{2, 477}_1 ∧ -b^{2, 477}_0 ∧ true) 
c  in CNF:
c    -b^{2, 477}_2 ∨  b^{2, 477}_1 ∨  b^{2, 477}_0 ∨ false 
c  in DIMACS:
-6077  6078  6079  0

c  3 does not represent an automaton state.
c    -(-b^{2, 477}_2 ∧  b^{2, 477}_1 ∧  b^{2, 477}_0 ∧ true) 
c  in CNF:
c     b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ false 
c  in DIMACS:
 6077 -6078 -6079  0
c  -3 does not represent an automaton state.
c    -( b^{2, 477}_2 ∧  b^{2, 477}_1 ∧  b^{2, 477}_0 ∧ true) 
c  in CNF:
c    -b^{2, 477}_2 ∨ -b^{2, 477}_1 ∨ -b^{2, 477}_0 ∨ false 
c  in DIMACS:
-6077 -6078 -6079  0

c i = 478
c  -2+1 --> -1
c    ( b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧  p_956) -> ( b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0)
c  in CNF:
c    -b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨  b^{2, 479}_2
c    -b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_1
c    -b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨  b^{2, 479}_0
c  in DIMACS:
-6080 -6081  6082 -956  6083 0
-6080 -6081  6082 -956 -6084 0
-6080 -6081  6082 -956  6085 0

c  -1+1 --> 0
c    ( b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0 ∧  p_956) -> (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧ -b^{2, 479}_0)
c  in CNF:
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_2
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_1
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_0
c  in DIMACS:
-6080  6081 -6082 -956 -6083 0
-6080  6081 -6082 -956 -6084 0
-6080  6081 -6082 -956 -6085 0

c  0+1 --> 1
c    (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧  p_956) -> (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0)
c  in CNF:
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_2
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_1
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨  b^{2, 479}_0
c  in DIMACS:
 6080  6081  6082 -956 -6083 0
 6080  6081  6082 -956 -6084 0
 6080  6081  6082 -956  6085 0

c  1+1 --> 2
c    (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0 ∧  p_956) -> (-b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0)
c  in CNF:
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_2
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨  b^{2, 479}_1
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ -p_956 ∨ -b^{2, 479}_0
c  in DIMACS:
 6080  6081 -6082 -956 -6083 0
 6080  6081 -6082 -956  6084 0
 6080  6081 -6082 -956 -6085 0

c  2+1 --> break 
c    (-b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧  p_956) -> break
c  in CNF:
c     b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ -p_956 ∨ break
c  in DIMACS:
 6080 -6081  6082 -956 1162 0


c  2-1 --> 1
c    (-b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧ -p_956) -> (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0)
c  in CNF:
c     b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_2
c     b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_1
c     b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨  b^{2, 479}_0
c  in DIMACS:
 6080 -6081  6082  956 -6083 0
 6080 -6081  6082  956 -6084 0
 6080 -6081  6082  956  6085 0

c  1-1 --> 0
c    (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0 ∧ -p_956) -> (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧ -b^{2, 479}_0)
c  in CNF:
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_2
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_1
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_0
c  in DIMACS:
 6080  6081 -6082  956 -6083 0
 6080  6081 -6082  956 -6084 0
 6080  6081 -6082  956 -6085 0

c  0-1 --> -1
c    (-b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧ -p_956) -> ( b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0)
c  in CNF:
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨  b^{2, 479}_2
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_1
c     b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨  b^{2, 479}_0
c  in DIMACS:
 6080  6081  6082  956  6083 0
 6080  6081  6082  956 -6084 0
 6080  6081  6082  956  6085 0

c  -1-1 --> -2
c    ( b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧  b^{2, 478}_0 ∧ -p_956) -> ( b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0)
c  in CNF:
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨  b^{2, 479}_2
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨  b^{2, 479}_1
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨  p_956 ∨ -b^{2, 479}_0
c  in DIMACS:
-6080  6081 -6082  956  6083 0
-6080  6081 -6082  956  6084 0
-6080  6081 -6082  956 -6085 0

c  -2-1 --> break 
c    ( b^{2, 478}_2 ∧  b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧ -p_956) -> break
c  in CNF:
c    -b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨  b^{2, 478}_0 ∨  p_956 ∨ break
c  in DIMACS:
-6080 -6081  6082  956 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 478}_2 ∧ -b^{2, 478}_1 ∧ -b^{2, 478}_0 ∧ true) 
c  in CNF:
c    -b^{2, 478}_2 ∨  b^{2, 478}_1 ∨  b^{2, 478}_0 ∨ false 
c  in DIMACS:
-6080  6081  6082  0

c  3 does not represent an automaton state.
c    -(-b^{2, 478}_2 ∧  b^{2, 478}_1 ∧  b^{2, 478}_0 ∧ true) 
c  in CNF:
c     b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ false 
c  in DIMACS:
 6080 -6081 -6082  0
c  -3 does not represent an automaton state.
c    -( b^{2, 478}_2 ∧  b^{2, 478}_1 ∧  b^{2, 478}_0 ∧ true) 
c  in CNF:
c    -b^{2, 478}_2 ∨ -b^{2, 478}_1 ∨ -b^{2, 478}_0 ∨ false 
c  in DIMACS:
-6080 -6081 -6082  0

c i = 479
c  -2+1 --> -1
c    ( b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧  p_958) -> ( b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0)
c  in CNF:
c    -b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨  b^{2, 480}_2
c    -b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_1
c    -b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨  b^{2, 480}_0
c  in DIMACS:
-6083 -6084  6085 -958  6086 0
-6083 -6084  6085 -958 -6087 0
-6083 -6084  6085 -958  6088 0

c  -1+1 --> 0
c    ( b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0 ∧  p_958) -> (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧ -b^{2, 480}_0)
c  in CNF:
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_2
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_1
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_0
c  in DIMACS:
-6083  6084 -6085 -958 -6086 0
-6083  6084 -6085 -958 -6087 0
-6083  6084 -6085 -958 -6088 0

c  0+1 --> 1
c    (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧  p_958) -> (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0)
c  in CNF:
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_2
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_1
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨  b^{2, 480}_0
c  in DIMACS:
 6083  6084  6085 -958 -6086 0
 6083  6084  6085 -958 -6087 0
 6083  6084  6085 -958  6088 0

c  1+1 --> 2
c    (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0 ∧  p_958) -> (-b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0)
c  in CNF:
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_2
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨  b^{2, 480}_1
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ -p_958 ∨ -b^{2, 480}_0
c  in DIMACS:
 6083  6084 -6085 -958 -6086 0
 6083  6084 -6085 -958  6087 0
 6083  6084 -6085 -958 -6088 0

c  2+1 --> break 
c    (-b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧  p_958) -> break
c  in CNF:
c     b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ -p_958 ∨ break
c  in DIMACS:
 6083 -6084  6085 -958 1162 0


c  2-1 --> 1
c    (-b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧ -p_958) -> (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0)
c  in CNF:
c     b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_2
c     b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_1
c     b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨  b^{2, 480}_0
c  in DIMACS:
 6083 -6084  6085  958 -6086 0
 6083 -6084  6085  958 -6087 0
 6083 -6084  6085  958  6088 0

c  1-1 --> 0
c    (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0 ∧ -p_958) -> (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧ -b^{2, 480}_0)
c  in CNF:
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_2
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_1
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_0
c  in DIMACS:
 6083  6084 -6085  958 -6086 0
 6083  6084 -6085  958 -6087 0
 6083  6084 -6085  958 -6088 0

c  0-1 --> -1
c    (-b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧ -p_958) -> ( b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0)
c  in CNF:
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨  b^{2, 480}_2
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_1
c     b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨  b^{2, 480}_0
c  in DIMACS:
 6083  6084  6085  958  6086 0
 6083  6084  6085  958 -6087 0
 6083  6084  6085  958  6088 0

c  -1-1 --> -2
c    ( b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧  b^{2, 479}_0 ∧ -p_958) -> ( b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0)
c  in CNF:
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨  b^{2, 480}_2
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨  b^{2, 480}_1
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨  p_958 ∨ -b^{2, 480}_0
c  in DIMACS:
-6083  6084 -6085  958  6086 0
-6083  6084 -6085  958  6087 0
-6083  6084 -6085  958 -6088 0

c  -2-1 --> break 
c    ( b^{2, 479}_2 ∧  b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧ -p_958) -> break
c  in CNF:
c    -b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨  b^{2, 479}_0 ∨  p_958 ∨ break
c  in DIMACS:
-6083 -6084  6085  958 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 479}_2 ∧ -b^{2, 479}_1 ∧ -b^{2, 479}_0 ∧ true) 
c  in CNF:
c    -b^{2, 479}_2 ∨  b^{2, 479}_1 ∨  b^{2, 479}_0 ∨ false 
c  in DIMACS:
-6083  6084  6085  0

c  3 does not represent an automaton state.
c    -(-b^{2, 479}_2 ∧  b^{2, 479}_1 ∧  b^{2, 479}_0 ∧ true) 
c  in CNF:
c     b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ false 
c  in DIMACS:
 6083 -6084 -6085  0
c  -3 does not represent an automaton state.
c    -( b^{2, 479}_2 ∧  b^{2, 479}_1 ∧  b^{2, 479}_0 ∧ true) 
c  in CNF:
c    -b^{2, 479}_2 ∨ -b^{2, 479}_1 ∨ -b^{2, 479}_0 ∨ false 
c  in DIMACS:
-6083 -6084 -6085  0

c i = 480
c  -2+1 --> -1
c    ( b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧  p_960) -> ( b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0)
c  in CNF:
c    -b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨  b^{2, 481}_2
c    -b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_1
c    -b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨  b^{2, 481}_0
c  in DIMACS:
-6086 -6087  6088 -960  6089 0
-6086 -6087  6088 -960 -6090 0
-6086 -6087  6088 -960  6091 0

c  -1+1 --> 0
c    ( b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0 ∧  p_960) -> (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧ -b^{2, 481}_0)
c  in CNF:
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_2
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_1
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_0
c  in DIMACS:
-6086  6087 -6088 -960 -6089 0
-6086  6087 -6088 -960 -6090 0
-6086  6087 -6088 -960 -6091 0

c  0+1 --> 1
c    (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧  p_960) -> (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0)
c  in CNF:
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_2
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_1
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨  b^{2, 481}_0
c  in DIMACS:
 6086  6087  6088 -960 -6089 0
 6086  6087  6088 -960 -6090 0
 6086  6087  6088 -960  6091 0

c  1+1 --> 2
c    (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0 ∧  p_960) -> (-b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0)
c  in CNF:
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_2
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨  b^{2, 481}_1
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ -p_960 ∨ -b^{2, 481}_0
c  in DIMACS:
 6086  6087 -6088 -960 -6089 0
 6086  6087 -6088 -960  6090 0
 6086  6087 -6088 -960 -6091 0

c  2+1 --> break 
c    (-b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧  p_960) -> break
c  in CNF:
c     b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 6086 -6087  6088 -960 1162 0


c  2-1 --> 1
c    (-b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧ -p_960) -> (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0)
c  in CNF:
c     b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_2
c     b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_1
c     b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨  b^{2, 481}_0
c  in DIMACS:
 6086 -6087  6088  960 -6089 0
 6086 -6087  6088  960 -6090 0
 6086 -6087  6088  960  6091 0

c  1-1 --> 0
c    (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0 ∧ -p_960) -> (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧ -b^{2, 481}_0)
c  in CNF:
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_2
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_1
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_0
c  in DIMACS:
 6086  6087 -6088  960 -6089 0
 6086  6087 -6088  960 -6090 0
 6086  6087 -6088  960 -6091 0

c  0-1 --> -1
c    (-b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧ -p_960) -> ( b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0)
c  in CNF:
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨  b^{2, 481}_2
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_1
c     b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨  b^{2, 481}_0
c  in DIMACS:
 6086  6087  6088  960  6089 0
 6086  6087  6088  960 -6090 0
 6086  6087  6088  960  6091 0

c  -1-1 --> -2
c    ( b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧  b^{2, 480}_0 ∧ -p_960) -> ( b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0)
c  in CNF:
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨  b^{2, 481}_2
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨  b^{2, 481}_1
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨  p_960 ∨ -b^{2, 481}_0
c  in DIMACS:
-6086  6087 -6088  960  6089 0
-6086  6087 -6088  960  6090 0
-6086  6087 -6088  960 -6091 0

c  -2-1 --> break 
c    ( b^{2, 480}_2 ∧  b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨  b^{2, 480}_0 ∨  p_960 ∨ break
c  in DIMACS:
-6086 -6087  6088  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 480}_2 ∧ -b^{2, 480}_1 ∧ -b^{2, 480}_0 ∧ true) 
c  in CNF:
c    -b^{2, 480}_2 ∨  b^{2, 480}_1 ∨  b^{2, 480}_0 ∨ false 
c  in DIMACS:
-6086  6087  6088  0

c  3 does not represent an automaton state.
c    -(-b^{2, 480}_2 ∧  b^{2, 480}_1 ∧  b^{2, 480}_0 ∧ true) 
c  in CNF:
c     b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ false 
c  in DIMACS:
 6086 -6087 -6088  0
c  -3 does not represent an automaton state.
c    -( b^{2, 480}_2 ∧  b^{2, 480}_1 ∧  b^{2, 480}_0 ∧ true) 
c  in CNF:
c    -b^{2, 480}_2 ∨ -b^{2, 480}_1 ∨ -b^{2, 480}_0 ∨ false 
c  in DIMACS:
-6086 -6087 -6088  0

c i = 481
c  -2+1 --> -1
c    ( b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧  p_962) -> ( b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0)
c  in CNF:
c    -b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨  b^{2, 482}_2
c    -b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_1
c    -b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨  b^{2, 482}_0
c  in DIMACS:
-6089 -6090  6091 -962  6092 0
-6089 -6090  6091 -962 -6093 0
-6089 -6090  6091 -962  6094 0

c  -1+1 --> 0
c    ( b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0 ∧  p_962) -> (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧ -b^{2, 482}_0)
c  in CNF:
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_2
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_1
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_0
c  in DIMACS:
-6089  6090 -6091 -962 -6092 0
-6089  6090 -6091 -962 -6093 0
-6089  6090 -6091 -962 -6094 0

c  0+1 --> 1
c    (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧  p_962) -> (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0)
c  in CNF:
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_2
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_1
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨  b^{2, 482}_0
c  in DIMACS:
 6089  6090  6091 -962 -6092 0
 6089  6090  6091 -962 -6093 0
 6089  6090  6091 -962  6094 0

c  1+1 --> 2
c    (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0 ∧  p_962) -> (-b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0)
c  in CNF:
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_2
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨  b^{2, 482}_1
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ -p_962 ∨ -b^{2, 482}_0
c  in DIMACS:
 6089  6090 -6091 -962 -6092 0
 6089  6090 -6091 -962  6093 0
 6089  6090 -6091 -962 -6094 0

c  2+1 --> break 
c    (-b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧  p_962) -> break
c  in CNF:
c     b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 6089 -6090  6091 -962 1162 0


c  2-1 --> 1
c    (-b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧ -p_962) -> (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0)
c  in CNF:
c     b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_2
c     b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_1
c     b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨  b^{2, 482}_0
c  in DIMACS:
 6089 -6090  6091  962 -6092 0
 6089 -6090  6091  962 -6093 0
 6089 -6090  6091  962  6094 0

c  1-1 --> 0
c    (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0 ∧ -p_962) -> (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧ -b^{2, 482}_0)
c  in CNF:
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_2
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_1
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_0
c  in DIMACS:
 6089  6090 -6091  962 -6092 0
 6089  6090 -6091  962 -6093 0
 6089  6090 -6091  962 -6094 0

c  0-1 --> -1
c    (-b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧ -p_962) -> ( b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0)
c  in CNF:
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨  b^{2, 482}_2
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_1
c     b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨  b^{2, 482}_0
c  in DIMACS:
 6089  6090  6091  962  6092 0
 6089  6090  6091  962 -6093 0
 6089  6090  6091  962  6094 0

c  -1-1 --> -2
c    ( b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧  b^{2, 481}_0 ∧ -p_962) -> ( b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0)
c  in CNF:
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨  b^{2, 482}_2
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨  b^{2, 482}_1
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨  p_962 ∨ -b^{2, 482}_0
c  in DIMACS:
-6089  6090 -6091  962  6092 0
-6089  6090 -6091  962  6093 0
-6089  6090 -6091  962 -6094 0

c  -2-1 --> break 
c    ( b^{2, 481}_2 ∧  b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨  b^{2, 481}_0 ∨  p_962 ∨ break
c  in DIMACS:
-6089 -6090  6091  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 481}_2 ∧ -b^{2, 481}_1 ∧ -b^{2, 481}_0 ∧ true) 
c  in CNF:
c    -b^{2, 481}_2 ∨  b^{2, 481}_1 ∨  b^{2, 481}_0 ∨ false 
c  in DIMACS:
-6089  6090  6091  0

c  3 does not represent an automaton state.
c    -(-b^{2, 481}_2 ∧  b^{2, 481}_1 ∧  b^{2, 481}_0 ∧ true) 
c  in CNF:
c     b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ false 
c  in DIMACS:
 6089 -6090 -6091  0
c  -3 does not represent an automaton state.
c    -( b^{2, 481}_2 ∧  b^{2, 481}_1 ∧  b^{2, 481}_0 ∧ true) 
c  in CNF:
c    -b^{2, 481}_2 ∨ -b^{2, 481}_1 ∨ -b^{2, 481}_0 ∨ false 
c  in DIMACS:
-6089 -6090 -6091  0

c i = 482
c  -2+1 --> -1
c    ( b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧  p_964) -> ( b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0)
c  in CNF:
c    -b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨  b^{2, 483}_2
c    -b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_1
c    -b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨  b^{2, 483}_0
c  in DIMACS:
-6092 -6093  6094 -964  6095 0
-6092 -6093  6094 -964 -6096 0
-6092 -6093  6094 -964  6097 0

c  -1+1 --> 0
c    ( b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0 ∧  p_964) -> (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧ -b^{2, 483}_0)
c  in CNF:
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_2
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_1
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_0
c  in DIMACS:
-6092  6093 -6094 -964 -6095 0
-6092  6093 -6094 -964 -6096 0
-6092  6093 -6094 -964 -6097 0

c  0+1 --> 1
c    (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧  p_964) -> (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0)
c  in CNF:
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_2
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_1
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨  b^{2, 483}_0
c  in DIMACS:
 6092  6093  6094 -964 -6095 0
 6092  6093  6094 -964 -6096 0
 6092  6093  6094 -964  6097 0

c  1+1 --> 2
c    (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0 ∧  p_964) -> (-b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0)
c  in CNF:
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_2
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨  b^{2, 483}_1
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ -p_964 ∨ -b^{2, 483}_0
c  in DIMACS:
 6092  6093 -6094 -964 -6095 0
 6092  6093 -6094 -964  6096 0
 6092  6093 -6094 -964 -6097 0

c  2+1 --> break 
c    (-b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧  p_964) -> break
c  in CNF:
c     b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ -p_964 ∨ break
c  in DIMACS:
 6092 -6093  6094 -964 1162 0


c  2-1 --> 1
c    (-b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧ -p_964) -> (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0)
c  in CNF:
c     b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_2
c     b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_1
c     b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨  b^{2, 483}_0
c  in DIMACS:
 6092 -6093  6094  964 -6095 0
 6092 -6093  6094  964 -6096 0
 6092 -6093  6094  964  6097 0

c  1-1 --> 0
c    (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0 ∧ -p_964) -> (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧ -b^{2, 483}_0)
c  in CNF:
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_2
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_1
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_0
c  in DIMACS:
 6092  6093 -6094  964 -6095 0
 6092  6093 -6094  964 -6096 0
 6092  6093 -6094  964 -6097 0

c  0-1 --> -1
c    (-b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧ -p_964) -> ( b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0)
c  in CNF:
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨  b^{2, 483}_2
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_1
c     b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨  b^{2, 483}_0
c  in DIMACS:
 6092  6093  6094  964  6095 0
 6092  6093  6094  964 -6096 0
 6092  6093  6094  964  6097 0

c  -1-1 --> -2
c    ( b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧  b^{2, 482}_0 ∧ -p_964) -> ( b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0)
c  in CNF:
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨  b^{2, 483}_2
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨  b^{2, 483}_1
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨  p_964 ∨ -b^{2, 483}_0
c  in DIMACS:
-6092  6093 -6094  964  6095 0
-6092  6093 -6094  964  6096 0
-6092  6093 -6094  964 -6097 0

c  -2-1 --> break 
c    ( b^{2, 482}_2 ∧  b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧ -p_964) -> break
c  in CNF:
c    -b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨  b^{2, 482}_0 ∨  p_964 ∨ break
c  in DIMACS:
-6092 -6093  6094  964 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 482}_2 ∧ -b^{2, 482}_1 ∧ -b^{2, 482}_0 ∧ true) 
c  in CNF:
c    -b^{2, 482}_2 ∨  b^{2, 482}_1 ∨  b^{2, 482}_0 ∨ false 
c  in DIMACS:
-6092  6093  6094  0

c  3 does not represent an automaton state.
c    -(-b^{2, 482}_2 ∧  b^{2, 482}_1 ∧  b^{2, 482}_0 ∧ true) 
c  in CNF:
c     b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ false 
c  in DIMACS:
 6092 -6093 -6094  0
c  -3 does not represent an automaton state.
c    -( b^{2, 482}_2 ∧  b^{2, 482}_1 ∧  b^{2, 482}_0 ∧ true) 
c  in CNF:
c    -b^{2, 482}_2 ∨ -b^{2, 482}_1 ∨ -b^{2, 482}_0 ∨ false 
c  in DIMACS:
-6092 -6093 -6094  0

c i = 483
c  -2+1 --> -1
c    ( b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧  p_966) -> ( b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0)
c  in CNF:
c    -b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨  b^{2, 484}_2
c    -b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_1
c    -b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨  b^{2, 484}_0
c  in DIMACS:
-6095 -6096  6097 -966  6098 0
-6095 -6096  6097 -966 -6099 0
-6095 -6096  6097 -966  6100 0

c  -1+1 --> 0
c    ( b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0 ∧  p_966) -> (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧ -b^{2, 484}_0)
c  in CNF:
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_2
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_1
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_0
c  in DIMACS:
-6095  6096 -6097 -966 -6098 0
-6095  6096 -6097 -966 -6099 0
-6095  6096 -6097 -966 -6100 0

c  0+1 --> 1
c    (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧  p_966) -> (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0)
c  in CNF:
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_2
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_1
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨  b^{2, 484}_0
c  in DIMACS:
 6095  6096  6097 -966 -6098 0
 6095  6096  6097 -966 -6099 0
 6095  6096  6097 -966  6100 0

c  1+1 --> 2
c    (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0 ∧  p_966) -> (-b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0)
c  in CNF:
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_2
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨  b^{2, 484}_1
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ -p_966 ∨ -b^{2, 484}_0
c  in DIMACS:
 6095  6096 -6097 -966 -6098 0
 6095  6096 -6097 -966  6099 0
 6095  6096 -6097 -966 -6100 0

c  2+1 --> break 
c    (-b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧  p_966) -> break
c  in CNF:
c     b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 6095 -6096  6097 -966 1162 0


c  2-1 --> 1
c    (-b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧ -p_966) -> (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0)
c  in CNF:
c     b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_2
c     b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_1
c     b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨  b^{2, 484}_0
c  in DIMACS:
 6095 -6096  6097  966 -6098 0
 6095 -6096  6097  966 -6099 0
 6095 -6096  6097  966  6100 0

c  1-1 --> 0
c    (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0 ∧ -p_966) -> (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧ -b^{2, 484}_0)
c  in CNF:
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_2
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_1
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_0
c  in DIMACS:
 6095  6096 -6097  966 -6098 0
 6095  6096 -6097  966 -6099 0
 6095  6096 -6097  966 -6100 0

c  0-1 --> -1
c    (-b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧ -p_966) -> ( b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0)
c  in CNF:
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨  b^{2, 484}_2
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_1
c     b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨  b^{2, 484}_0
c  in DIMACS:
 6095  6096  6097  966  6098 0
 6095  6096  6097  966 -6099 0
 6095  6096  6097  966  6100 0

c  -1-1 --> -2
c    ( b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧  b^{2, 483}_0 ∧ -p_966) -> ( b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0)
c  in CNF:
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨  b^{2, 484}_2
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨  b^{2, 484}_1
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨  p_966 ∨ -b^{2, 484}_0
c  in DIMACS:
-6095  6096 -6097  966  6098 0
-6095  6096 -6097  966  6099 0
-6095  6096 -6097  966 -6100 0

c  -2-1 --> break 
c    ( b^{2, 483}_2 ∧  b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨  b^{2, 483}_0 ∨  p_966 ∨ break
c  in DIMACS:
-6095 -6096  6097  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 483}_2 ∧ -b^{2, 483}_1 ∧ -b^{2, 483}_0 ∧ true) 
c  in CNF:
c    -b^{2, 483}_2 ∨  b^{2, 483}_1 ∨  b^{2, 483}_0 ∨ false 
c  in DIMACS:
-6095  6096  6097  0

c  3 does not represent an automaton state.
c    -(-b^{2, 483}_2 ∧  b^{2, 483}_1 ∧  b^{2, 483}_0 ∧ true) 
c  in CNF:
c     b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ false 
c  in DIMACS:
 6095 -6096 -6097  0
c  -3 does not represent an automaton state.
c    -( b^{2, 483}_2 ∧  b^{2, 483}_1 ∧  b^{2, 483}_0 ∧ true) 
c  in CNF:
c    -b^{2, 483}_2 ∨ -b^{2, 483}_1 ∨ -b^{2, 483}_0 ∨ false 
c  in DIMACS:
-6095 -6096 -6097  0

c i = 484
c  -2+1 --> -1
c    ( b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧  p_968) -> ( b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0)
c  in CNF:
c    -b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨  b^{2, 485}_2
c    -b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_1
c    -b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨  b^{2, 485}_0
c  in DIMACS:
-6098 -6099  6100 -968  6101 0
-6098 -6099  6100 -968 -6102 0
-6098 -6099  6100 -968  6103 0

c  -1+1 --> 0
c    ( b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0 ∧  p_968) -> (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧ -b^{2, 485}_0)
c  in CNF:
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_2
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_1
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_0
c  in DIMACS:
-6098  6099 -6100 -968 -6101 0
-6098  6099 -6100 -968 -6102 0
-6098  6099 -6100 -968 -6103 0

c  0+1 --> 1
c    (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧  p_968) -> (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0)
c  in CNF:
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_2
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_1
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨  b^{2, 485}_0
c  in DIMACS:
 6098  6099  6100 -968 -6101 0
 6098  6099  6100 -968 -6102 0
 6098  6099  6100 -968  6103 0

c  1+1 --> 2
c    (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0 ∧  p_968) -> (-b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0)
c  in CNF:
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_2
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨  b^{2, 485}_1
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ -p_968 ∨ -b^{2, 485}_0
c  in DIMACS:
 6098  6099 -6100 -968 -6101 0
 6098  6099 -6100 -968  6102 0
 6098  6099 -6100 -968 -6103 0

c  2+1 --> break 
c    (-b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧  p_968) -> break
c  in CNF:
c     b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 6098 -6099  6100 -968 1162 0


c  2-1 --> 1
c    (-b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧ -p_968) -> (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0)
c  in CNF:
c     b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_2
c     b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_1
c     b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨  b^{2, 485}_0
c  in DIMACS:
 6098 -6099  6100  968 -6101 0
 6098 -6099  6100  968 -6102 0
 6098 -6099  6100  968  6103 0

c  1-1 --> 0
c    (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0 ∧ -p_968) -> (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧ -b^{2, 485}_0)
c  in CNF:
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_2
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_1
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_0
c  in DIMACS:
 6098  6099 -6100  968 -6101 0
 6098  6099 -6100  968 -6102 0
 6098  6099 -6100  968 -6103 0

c  0-1 --> -1
c    (-b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧ -p_968) -> ( b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0)
c  in CNF:
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨  b^{2, 485}_2
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_1
c     b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨  b^{2, 485}_0
c  in DIMACS:
 6098  6099  6100  968  6101 0
 6098  6099  6100  968 -6102 0
 6098  6099  6100  968  6103 0

c  -1-1 --> -2
c    ( b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧  b^{2, 484}_0 ∧ -p_968) -> ( b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0)
c  in CNF:
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨  b^{2, 485}_2
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨  b^{2, 485}_1
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨  p_968 ∨ -b^{2, 485}_0
c  in DIMACS:
-6098  6099 -6100  968  6101 0
-6098  6099 -6100  968  6102 0
-6098  6099 -6100  968 -6103 0

c  -2-1 --> break 
c    ( b^{2, 484}_2 ∧  b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨  b^{2, 484}_0 ∨  p_968 ∨ break
c  in DIMACS:
-6098 -6099  6100  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 484}_2 ∧ -b^{2, 484}_1 ∧ -b^{2, 484}_0 ∧ true) 
c  in CNF:
c    -b^{2, 484}_2 ∨  b^{2, 484}_1 ∨  b^{2, 484}_0 ∨ false 
c  in DIMACS:
-6098  6099  6100  0

c  3 does not represent an automaton state.
c    -(-b^{2, 484}_2 ∧  b^{2, 484}_1 ∧  b^{2, 484}_0 ∧ true) 
c  in CNF:
c     b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ false 
c  in DIMACS:
 6098 -6099 -6100  0
c  -3 does not represent an automaton state.
c    -( b^{2, 484}_2 ∧  b^{2, 484}_1 ∧  b^{2, 484}_0 ∧ true) 
c  in CNF:
c    -b^{2, 484}_2 ∨ -b^{2, 484}_1 ∨ -b^{2, 484}_0 ∨ false 
c  in DIMACS:
-6098 -6099 -6100  0

c i = 485
c  -2+1 --> -1
c    ( b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧  p_970) -> ( b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0)
c  in CNF:
c    -b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨  b^{2, 486}_2
c    -b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_1
c    -b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨  b^{2, 486}_0
c  in DIMACS:
-6101 -6102  6103 -970  6104 0
-6101 -6102  6103 -970 -6105 0
-6101 -6102  6103 -970  6106 0

c  -1+1 --> 0
c    ( b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0 ∧  p_970) -> (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧ -b^{2, 486}_0)
c  in CNF:
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_2
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_1
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_0
c  in DIMACS:
-6101  6102 -6103 -970 -6104 0
-6101  6102 -6103 -970 -6105 0
-6101  6102 -6103 -970 -6106 0

c  0+1 --> 1
c    (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧  p_970) -> (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0)
c  in CNF:
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_2
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_1
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨  b^{2, 486}_0
c  in DIMACS:
 6101  6102  6103 -970 -6104 0
 6101  6102  6103 -970 -6105 0
 6101  6102  6103 -970  6106 0

c  1+1 --> 2
c    (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0 ∧  p_970) -> (-b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0)
c  in CNF:
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_2
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨  b^{2, 486}_1
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ -p_970 ∨ -b^{2, 486}_0
c  in DIMACS:
 6101  6102 -6103 -970 -6104 0
 6101  6102 -6103 -970  6105 0
 6101  6102 -6103 -970 -6106 0

c  2+1 --> break 
c    (-b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧  p_970) -> break
c  in CNF:
c     b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 6101 -6102  6103 -970 1162 0


c  2-1 --> 1
c    (-b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧ -p_970) -> (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0)
c  in CNF:
c     b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_2
c     b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_1
c     b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨  b^{2, 486}_0
c  in DIMACS:
 6101 -6102  6103  970 -6104 0
 6101 -6102  6103  970 -6105 0
 6101 -6102  6103  970  6106 0

c  1-1 --> 0
c    (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0 ∧ -p_970) -> (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧ -b^{2, 486}_0)
c  in CNF:
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_2
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_1
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_0
c  in DIMACS:
 6101  6102 -6103  970 -6104 0
 6101  6102 -6103  970 -6105 0
 6101  6102 -6103  970 -6106 0

c  0-1 --> -1
c    (-b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧ -p_970) -> ( b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0)
c  in CNF:
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨  b^{2, 486}_2
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_1
c     b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨  b^{2, 486}_0
c  in DIMACS:
 6101  6102  6103  970  6104 0
 6101  6102  6103  970 -6105 0
 6101  6102  6103  970  6106 0

c  -1-1 --> -2
c    ( b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧  b^{2, 485}_0 ∧ -p_970) -> ( b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0)
c  in CNF:
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨  b^{2, 486}_2
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨  b^{2, 486}_1
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨  p_970 ∨ -b^{2, 486}_0
c  in DIMACS:
-6101  6102 -6103  970  6104 0
-6101  6102 -6103  970  6105 0
-6101  6102 -6103  970 -6106 0

c  -2-1 --> break 
c    ( b^{2, 485}_2 ∧  b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨  b^{2, 485}_0 ∨  p_970 ∨ break
c  in DIMACS:
-6101 -6102  6103  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 485}_2 ∧ -b^{2, 485}_1 ∧ -b^{2, 485}_0 ∧ true) 
c  in CNF:
c    -b^{2, 485}_2 ∨  b^{2, 485}_1 ∨  b^{2, 485}_0 ∨ false 
c  in DIMACS:
-6101  6102  6103  0

c  3 does not represent an automaton state.
c    -(-b^{2, 485}_2 ∧  b^{2, 485}_1 ∧  b^{2, 485}_0 ∧ true) 
c  in CNF:
c     b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ false 
c  in DIMACS:
 6101 -6102 -6103  0
c  -3 does not represent an automaton state.
c    -( b^{2, 485}_2 ∧  b^{2, 485}_1 ∧  b^{2, 485}_0 ∧ true) 
c  in CNF:
c    -b^{2, 485}_2 ∨ -b^{2, 485}_1 ∨ -b^{2, 485}_0 ∨ false 
c  in DIMACS:
-6101 -6102 -6103  0

c i = 486
c  -2+1 --> -1
c    ( b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧  p_972) -> ( b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0)
c  in CNF:
c    -b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨  b^{2, 487}_2
c    -b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_1
c    -b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨  b^{2, 487}_0
c  in DIMACS:
-6104 -6105  6106 -972  6107 0
-6104 -6105  6106 -972 -6108 0
-6104 -6105  6106 -972  6109 0

c  -1+1 --> 0
c    ( b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0 ∧  p_972) -> (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧ -b^{2, 487}_0)
c  in CNF:
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_2
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_1
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_0
c  in DIMACS:
-6104  6105 -6106 -972 -6107 0
-6104  6105 -6106 -972 -6108 0
-6104  6105 -6106 -972 -6109 0

c  0+1 --> 1
c    (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧  p_972) -> (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0)
c  in CNF:
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_2
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_1
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨  b^{2, 487}_0
c  in DIMACS:
 6104  6105  6106 -972 -6107 0
 6104  6105  6106 -972 -6108 0
 6104  6105  6106 -972  6109 0

c  1+1 --> 2
c    (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0 ∧  p_972) -> (-b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0)
c  in CNF:
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_2
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨  b^{2, 487}_1
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ -p_972 ∨ -b^{2, 487}_0
c  in DIMACS:
 6104  6105 -6106 -972 -6107 0
 6104  6105 -6106 -972  6108 0
 6104  6105 -6106 -972 -6109 0

c  2+1 --> break 
c    (-b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧  p_972) -> break
c  in CNF:
c     b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 6104 -6105  6106 -972 1162 0


c  2-1 --> 1
c    (-b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧ -p_972) -> (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0)
c  in CNF:
c     b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_2
c     b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_1
c     b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨  b^{2, 487}_0
c  in DIMACS:
 6104 -6105  6106  972 -6107 0
 6104 -6105  6106  972 -6108 0
 6104 -6105  6106  972  6109 0

c  1-1 --> 0
c    (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0 ∧ -p_972) -> (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧ -b^{2, 487}_0)
c  in CNF:
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_2
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_1
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_0
c  in DIMACS:
 6104  6105 -6106  972 -6107 0
 6104  6105 -6106  972 -6108 0
 6104  6105 -6106  972 -6109 0

c  0-1 --> -1
c    (-b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧ -p_972) -> ( b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0)
c  in CNF:
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨  b^{2, 487}_2
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_1
c     b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨  b^{2, 487}_0
c  in DIMACS:
 6104  6105  6106  972  6107 0
 6104  6105  6106  972 -6108 0
 6104  6105  6106  972  6109 0

c  -1-1 --> -2
c    ( b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧  b^{2, 486}_0 ∧ -p_972) -> ( b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0)
c  in CNF:
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨  b^{2, 487}_2
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨  b^{2, 487}_1
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨  p_972 ∨ -b^{2, 487}_0
c  in DIMACS:
-6104  6105 -6106  972  6107 0
-6104  6105 -6106  972  6108 0
-6104  6105 -6106  972 -6109 0

c  -2-1 --> break 
c    ( b^{2, 486}_2 ∧  b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨  b^{2, 486}_0 ∨  p_972 ∨ break
c  in DIMACS:
-6104 -6105  6106  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 486}_2 ∧ -b^{2, 486}_1 ∧ -b^{2, 486}_0 ∧ true) 
c  in CNF:
c    -b^{2, 486}_2 ∨  b^{2, 486}_1 ∨  b^{2, 486}_0 ∨ false 
c  in DIMACS:
-6104  6105  6106  0

c  3 does not represent an automaton state.
c    -(-b^{2, 486}_2 ∧  b^{2, 486}_1 ∧  b^{2, 486}_0 ∧ true) 
c  in CNF:
c     b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ false 
c  in DIMACS:
 6104 -6105 -6106  0
c  -3 does not represent an automaton state.
c    -( b^{2, 486}_2 ∧  b^{2, 486}_1 ∧  b^{2, 486}_0 ∧ true) 
c  in CNF:
c    -b^{2, 486}_2 ∨ -b^{2, 486}_1 ∨ -b^{2, 486}_0 ∨ false 
c  in DIMACS:
-6104 -6105 -6106  0

c i = 487
c  -2+1 --> -1
c    ( b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧  p_974) -> ( b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0)
c  in CNF:
c    -b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨  b^{2, 488}_2
c    -b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_1
c    -b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨  b^{2, 488}_0
c  in DIMACS:
-6107 -6108  6109 -974  6110 0
-6107 -6108  6109 -974 -6111 0
-6107 -6108  6109 -974  6112 0

c  -1+1 --> 0
c    ( b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0 ∧  p_974) -> (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧ -b^{2, 488}_0)
c  in CNF:
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_2
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_1
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_0
c  in DIMACS:
-6107  6108 -6109 -974 -6110 0
-6107  6108 -6109 -974 -6111 0
-6107  6108 -6109 -974 -6112 0

c  0+1 --> 1
c    (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧  p_974) -> (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0)
c  in CNF:
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_2
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_1
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨  b^{2, 488}_0
c  in DIMACS:
 6107  6108  6109 -974 -6110 0
 6107  6108  6109 -974 -6111 0
 6107  6108  6109 -974  6112 0

c  1+1 --> 2
c    (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0 ∧  p_974) -> (-b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0)
c  in CNF:
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_2
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨  b^{2, 488}_1
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ -p_974 ∨ -b^{2, 488}_0
c  in DIMACS:
 6107  6108 -6109 -974 -6110 0
 6107  6108 -6109 -974  6111 0
 6107  6108 -6109 -974 -6112 0

c  2+1 --> break 
c    (-b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧  p_974) -> break
c  in CNF:
c     b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ -p_974 ∨ break
c  in DIMACS:
 6107 -6108  6109 -974 1162 0


c  2-1 --> 1
c    (-b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧ -p_974) -> (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0)
c  in CNF:
c     b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_2
c     b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_1
c     b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨  b^{2, 488}_0
c  in DIMACS:
 6107 -6108  6109  974 -6110 0
 6107 -6108  6109  974 -6111 0
 6107 -6108  6109  974  6112 0

c  1-1 --> 0
c    (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0 ∧ -p_974) -> (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧ -b^{2, 488}_0)
c  in CNF:
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_2
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_1
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_0
c  in DIMACS:
 6107  6108 -6109  974 -6110 0
 6107  6108 -6109  974 -6111 0
 6107  6108 -6109  974 -6112 0

c  0-1 --> -1
c    (-b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧ -p_974) -> ( b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0)
c  in CNF:
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨  b^{2, 488}_2
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_1
c     b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨  b^{2, 488}_0
c  in DIMACS:
 6107  6108  6109  974  6110 0
 6107  6108  6109  974 -6111 0
 6107  6108  6109  974  6112 0

c  -1-1 --> -2
c    ( b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧  b^{2, 487}_0 ∧ -p_974) -> ( b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0)
c  in CNF:
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨  b^{2, 488}_2
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨  b^{2, 488}_1
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨  p_974 ∨ -b^{2, 488}_0
c  in DIMACS:
-6107  6108 -6109  974  6110 0
-6107  6108 -6109  974  6111 0
-6107  6108 -6109  974 -6112 0

c  -2-1 --> break 
c    ( b^{2, 487}_2 ∧  b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧ -p_974) -> break
c  in CNF:
c    -b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨  b^{2, 487}_0 ∨  p_974 ∨ break
c  in DIMACS:
-6107 -6108  6109  974 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 487}_2 ∧ -b^{2, 487}_1 ∧ -b^{2, 487}_0 ∧ true) 
c  in CNF:
c    -b^{2, 487}_2 ∨  b^{2, 487}_1 ∨  b^{2, 487}_0 ∨ false 
c  in DIMACS:
-6107  6108  6109  0

c  3 does not represent an automaton state.
c    -(-b^{2, 487}_2 ∧  b^{2, 487}_1 ∧  b^{2, 487}_0 ∧ true) 
c  in CNF:
c     b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ false 
c  in DIMACS:
 6107 -6108 -6109  0
c  -3 does not represent an automaton state.
c    -( b^{2, 487}_2 ∧  b^{2, 487}_1 ∧  b^{2, 487}_0 ∧ true) 
c  in CNF:
c    -b^{2, 487}_2 ∨ -b^{2, 487}_1 ∨ -b^{2, 487}_0 ∨ false 
c  in DIMACS:
-6107 -6108 -6109  0

c i = 488
c  -2+1 --> -1
c    ( b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧  p_976) -> ( b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0)
c  in CNF:
c    -b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨  b^{2, 489}_2
c    -b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_1
c    -b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨  b^{2, 489}_0
c  in DIMACS:
-6110 -6111  6112 -976  6113 0
-6110 -6111  6112 -976 -6114 0
-6110 -6111  6112 -976  6115 0

c  -1+1 --> 0
c    ( b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0 ∧  p_976) -> (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧ -b^{2, 489}_0)
c  in CNF:
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_2
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_1
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_0
c  in DIMACS:
-6110  6111 -6112 -976 -6113 0
-6110  6111 -6112 -976 -6114 0
-6110  6111 -6112 -976 -6115 0

c  0+1 --> 1
c    (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧  p_976) -> (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0)
c  in CNF:
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_2
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_1
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨  b^{2, 489}_0
c  in DIMACS:
 6110  6111  6112 -976 -6113 0
 6110  6111  6112 -976 -6114 0
 6110  6111  6112 -976  6115 0

c  1+1 --> 2
c    (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0 ∧  p_976) -> (-b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0)
c  in CNF:
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_2
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨  b^{2, 489}_1
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ -p_976 ∨ -b^{2, 489}_0
c  in DIMACS:
 6110  6111 -6112 -976 -6113 0
 6110  6111 -6112 -976  6114 0
 6110  6111 -6112 -976 -6115 0

c  2+1 --> break 
c    (-b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧  p_976) -> break
c  in CNF:
c     b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 6110 -6111  6112 -976 1162 0


c  2-1 --> 1
c    (-b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧ -p_976) -> (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0)
c  in CNF:
c     b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_2
c     b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_1
c     b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨  b^{2, 489}_0
c  in DIMACS:
 6110 -6111  6112  976 -6113 0
 6110 -6111  6112  976 -6114 0
 6110 -6111  6112  976  6115 0

c  1-1 --> 0
c    (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0 ∧ -p_976) -> (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧ -b^{2, 489}_0)
c  in CNF:
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_2
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_1
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_0
c  in DIMACS:
 6110  6111 -6112  976 -6113 0
 6110  6111 -6112  976 -6114 0
 6110  6111 -6112  976 -6115 0

c  0-1 --> -1
c    (-b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧ -p_976) -> ( b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0)
c  in CNF:
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨  b^{2, 489}_2
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_1
c     b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨  b^{2, 489}_0
c  in DIMACS:
 6110  6111  6112  976  6113 0
 6110  6111  6112  976 -6114 0
 6110  6111  6112  976  6115 0

c  -1-1 --> -2
c    ( b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧  b^{2, 488}_0 ∧ -p_976) -> ( b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0)
c  in CNF:
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨  b^{2, 489}_2
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨  b^{2, 489}_1
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨  p_976 ∨ -b^{2, 489}_0
c  in DIMACS:
-6110  6111 -6112  976  6113 0
-6110  6111 -6112  976  6114 0
-6110  6111 -6112  976 -6115 0

c  -2-1 --> break 
c    ( b^{2, 488}_2 ∧  b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨  b^{2, 488}_0 ∨  p_976 ∨ break
c  in DIMACS:
-6110 -6111  6112  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 488}_2 ∧ -b^{2, 488}_1 ∧ -b^{2, 488}_0 ∧ true) 
c  in CNF:
c    -b^{2, 488}_2 ∨  b^{2, 488}_1 ∨  b^{2, 488}_0 ∨ false 
c  in DIMACS:
-6110  6111  6112  0

c  3 does not represent an automaton state.
c    -(-b^{2, 488}_2 ∧  b^{2, 488}_1 ∧  b^{2, 488}_0 ∧ true) 
c  in CNF:
c     b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ false 
c  in DIMACS:
 6110 -6111 -6112  0
c  -3 does not represent an automaton state.
c    -( b^{2, 488}_2 ∧  b^{2, 488}_1 ∧  b^{2, 488}_0 ∧ true) 
c  in CNF:
c    -b^{2, 488}_2 ∨ -b^{2, 488}_1 ∨ -b^{2, 488}_0 ∨ false 
c  in DIMACS:
-6110 -6111 -6112  0

c i = 489
c  -2+1 --> -1
c    ( b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧  p_978) -> ( b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0)
c  in CNF:
c    -b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨  b^{2, 490}_2
c    -b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_1
c    -b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨  b^{2, 490}_0
c  in DIMACS:
-6113 -6114  6115 -978  6116 0
-6113 -6114  6115 -978 -6117 0
-6113 -6114  6115 -978  6118 0

c  -1+1 --> 0
c    ( b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0 ∧  p_978) -> (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧ -b^{2, 490}_0)
c  in CNF:
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_2
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_1
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_0
c  in DIMACS:
-6113  6114 -6115 -978 -6116 0
-6113  6114 -6115 -978 -6117 0
-6113  6114 -6115 -978 -6118 0

c  0+1 --> 1
c    (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧  p_978) -> (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0)
c  in CNF:
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_2
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_1
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨  b^{2, 490}_0
c  in DIMACS:
 6113  6114  6115 -978 -6116 0
 6113  6114  6115 -978 -6117 0
 6113  6114  6115 -978  6118 0

c  1+1 --> 2
c    (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0 ∧  p_978) -> (-b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0)
c  in CNF:
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_2
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨  b^{2, 490}_1
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ -p_978 ∨ -b^{2, 490}_0
c  in DIMACS:
 6113  6114 -6115 -978 -6116 0
 6113  6114 -6115 -978  6117 0
 6113  6114 -6115 -978 -6118 0

c  2+1 --> break 
c    (-b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧  p_978) -> break
c  in CNF:
c     b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 6113 -6114  6115 -978 1162 0


c  2-1 --> 1
c    (-b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧ -p_978) -> (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0)
c  in CNF:
c     b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_2
c     b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_1
c     b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨  b^{2, 490}_0
c  in DIMACS:
 6113 -6114  6115  978 -6116 0
 6113 -6114  6115  978 -6117 0
 6113 -6114  6115  978  6118 0

c  1-1 --> 0
c    (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0 ∧ -p_978) -> (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧ -b^{2, 490}_0)
c  in CNF:
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_2
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_1
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_0
c  in DIMACS:
 6113  6114 -6115  978 -6116 0
 6113  6114 -6115  978 -6117 0
 6113  6114 -6115  978 -6118 0

c  0-1 --> -1
c    (-b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧ -p_978) -> ( b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0)
c  in CNF:
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨  b^{2, 490}_2
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_1
c     b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨  b^{2, 490}_0
c  in DIMACS:
 6113  6114  6115  978  6116 0
 6113  6114  6115  978 -6117 0
 6113  6114  6115  978  6118 0

c  -1-1 --> -2
c    ( b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧  b^{2, 489}_0 ∧ -p_978) -> ( b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0)
c  in CNF:
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨  b^{2, 490}_2
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨  b^{2, 490}_1
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨  p_978 ∨ -b^{2, 490}_0
c  in DIMACS:
-6113  6114 -6115  978  6116 0
-6113  6114 -6115  978  6117 0
-6113  6114 -6115  978 -6118 0

c  -2-1 --> break 
c    ( b^{2, 489}_2 ∧  b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨  b^{2, 489}_0 ∨  p_978 ∨ break
c  in DIMACS:
-6113 -6114  6115  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 489}_2 ∧ -b^{2, 489}_1 ∧ -b^{2, 489}_0 ∧ true) 
c  in CNF:
c    -b^{2, 489}_2 ∨  b^{2, 489}_1 ∨  b^{2, 489}_0 ∨ false 
c  in DIMACS:
-6113  6114  6115  0

c  3 does not represent an automaton state.
c    -(-b^{2, 489}_2 ∧  b^{2, 489}_1 ∧  b^{2, 489}_0 ∧ true) 
c  in CNF:
c     b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ false 
c  in DIMACS:
 6113 -6114 -6115  0
c  -3 does not represent an automaton state.
c    -( b^{2, 489}_2 ∧  b^{2, 489}_1 ∧  b^{2, 489}_0 ∧ true) 
c  in CNF:
c    -b^{2, 489}_2 ∨ -b^{2, 489}_1 ∨ -b^{2, 489}_0 ∨ false 
c  in DIMACS:
-6113 -6114 -6115  0

c i = 490
c  -2+1 --> -1
c    ( b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧  p_980) -> ( b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0)
c  in CNF:
c    -b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨  b^{2, 491}_2
c    -b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_1
c    -b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨  b^{2, 491}_0
c  in DIMACS:
-6116 -6117  6118 -980  6119 0
-6116 -6117  6118 -980 -6120 0
-6116 -6117  6118 -980  6121 0

c  -1+1 --> 0
c    ( b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0 ∧  p_980) -> (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧ -b^{2, 491}_0)
c  in CNF:
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_2
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_1
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_0
c  in DIMACS:
-6116  6117 -6118 -980 -6119 0
-6116  6117 -6118 -980 -6120 0
-6116  6117 -6118 -980 -6121 0

c  0+1 --> 1
c    (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧  p_980) -> (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0)
c  in CNF:
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_2
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_1
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨  b^{2, 491}_0
c  in DIMACS:
 6116  6117  6118 -980 -6119 0
 6116  6117  6118 -980 -6120 0
 6116  6117  6118 -980  6121 0

c  1+1 --> 2
c    (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0 ∧  p_980) -> (-b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0)
c  in CNF:
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_2
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨  b^{2, 491}_1
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ -p_980 ∨ -b^{2, 491}_0
c  in DIMACS:
 6116  6117 -6118 -980 -6119 0
 6116  6117 -6118 -980  6120 0
 6116  6117 -6118 -980 -6121 0

c  2+1 --> break 
c    (-b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧  p_980) -> break
c  in CNF:
c     b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 6116 -6117  6118 -980 1162 0


c  2-1 --> 1
c    (-b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧ -p_980) -> (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0)
c  in CNF:
c     b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_2
c     b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_1
c     b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨  b^{2, 491}_0
c  in DIMACS:
 6116 -6117  6118  980 -6119 0
 6116 -6117  6118  980 -6120 0
 6116 -6117  6118  980  6121 0

c  1-1 --> 0
c    (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0 ∧ -p_980) -> (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧ -b^{2, 491}_0)
c  in CNF:
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_2
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_1
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_0
c  in DIMACS:
 6116  6117 -6118  980 -6119 0
 6116  6117 -6118  980 -6120 0
 6116  6117 -6118  980 -6121 0

c  0-1 --> -1
c    (-b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧ -p_980) -> ( b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0)
c  in CNF:
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨  b^{2, 491}_2
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_1
c     b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨  b^{2, 491}_0
c  in DIMACS:
 6116  6117  6118  980  6119 0
 6116  6117  6118  980 -6120 0
 6116  6117  6118  980  6121 0

c  -1-1 --> -2
c    ( b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧  b^{2, 490}_0 ∧ -p_980) -> ( b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0)
c  in CNF:
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨  b^{2, 491}_2
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨  b^{2, 491}_1
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨  p_980 ∨ -b^{2, 491}_0
c  in DIMACS:
-6116  6117 -6118  980  6119 0
-6116  6117 -6118  980  6120 0
-6116  6117 -6118  980 -6121 0

c  -2-1 --> break 
c    ( b^{2, 490}_2 ∧  b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨  b^{2, 490}_0 ∨  p_980 ∨ break
c  in DIMACS:
-6116 -6117  6118  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 490}_2 ∧ -b^{2, 490}_1 ∧ -b^{2, 490}_0 ∧ true) 
c  in CNF:
c    -b^{2, 490}_2 ∨  b^{2, 490}_1 ∨  b^{2, 490}_0 ∨ false 
c  in DIMACS:
-6116  6117  6118  0

c  3 does not represent an automaton state.
c    -(-b^{2, 490}_2 ∧  b^{2, 490}_1 ∧  b^{2, 490}_0 ∧ true) 
c  in CNF:
c     b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ false 
c  in DIMACS:
 6116 -6117 -6118  0
c  -3 does not represent an automaton state.
c    -( b^{2, 490}_2 ∧  b^{2, 490}_1 ∧  b^{2, 490}_0 ∧ true) 
c  in CNF:
c    -b^{2, 490}_2 ∨ -b^{2, 490}_1 ∨ -b^{2, 490}_0 ∨ false 
c  in DIMACS:
-6116 -6117 -6118  0

c i = 491
c  -2+1 --> -1
c    ( b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧  p_982) -> ( b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0)
c  in CNF:
c    -b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨  b^{2, 492}_2
c    -b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_1
c    -b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨  b^{2, 492}_0
c  in DIMACS:
-6119 -6120  6121 -982  6122 0
-6119 -6120  6121 -982 -6123 0
-6119 -6120  6121 -982  6124 0

c  -1+1 --> 0
c    ( b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0 ∧  p_982) -> (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧ -b^{2, 492}_0)
c  in CNF:
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_2
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_1
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_0
c  in DIMACS:
-6119  6120 -6121 -982 -6122 0
-6119  6120 -6121 -982 -6123 0
-6119  6120 -6121 -982 -6124 0

c  0+1 --> 1
c    (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧  p_982) -> (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0)
c  in CNF:
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_2
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_1
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨  b^{2, 492}_0
c  in DIMACS:
 6119  6120  6121 -982 -6122 0
 6119  6120  6121 -982 -6123 0
 6119  6120  6121 -982  6124 0

c  1+1 --> 2
c    (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0 ∧  p_982) -> (-b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0)
c  in CNF:
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_2
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨  b^{2, 492}_1
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ -p_982 ∨ -b^{2, 492}_0
c  in DIMACS:
 6119  6120 -6121 -982 -6122 0
 6119  6120 -6121 -982  6123 0
 6119  6120 -6121 -982 -6124 0

c  2+1 --> break 
c    (-b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧  p_982) -> break
c  in CNF:
c     b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ -p_982 ∨ break
c  in DIMACS:
 6119 -6120  6121 -982 1162 0


c  2-1 --> 1
c    (-b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧ -p_982) -> (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0)
c  in CNF:
c     b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_2
c     b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_1
c     b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨  b^{2, 492}_0
c  in DIMACS:
 6119 -6120  6121  982 -6122 0
 6119 -6120  6121  982 -6123 0
 6119 -6120  6121  982  6124 0

c  1-1 --> 0
c    (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0 ∧ -p_982) -> (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧ -b^{2, 492}_0)
c  in CNF:
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_2
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_1
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_0
c  in DIMACS:
 6119  6120 -6121  982 -6122 0
 6119  6120 -6121  982 -6123 0
 6119  6120 -6121  982 -6124 0

c  0-1 --> -1
c    (-b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧ -p_982) -> ( b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0)
c  in CNF:
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨  b^{2, 492}_2
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_1
c     b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨  b^{2, 492}_0
c  in DIMACS:
 6119  6120  6121  982  6122 0
 6119  6120  6121  982 -6123 0
 6119  6120  6121  982  6124 0

c  -1-1 --> -2
c    ( b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧  b^{2, 491}_0 ∧ -p_982) -> ( b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0)
c  in CNF:
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨  b^{2, 492}_2
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨  b^{2, 492}_1
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨  p_982 ∨ -b^{2, 492}_0
c  in DIMACS:
-6119  6120 -6121  982  6122 0
-6119  6120 -6121  982  6123 0
-6119  6120 -6121  982 -6124 0

c  -2-1 --> break 
c    ( b^{2, 491}_2 ∧  b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧ -p_982) -> break
c  in CNF:
c    -b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨  b^{2, 491}_0 ∨  p_982 ∨ break
c  in DIMACS:
-6119 -6120  6121  982 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 491}_2 ∧ -b^{2, 491}_1 ∧ -b^{2, 491}_0 ∧ true) 
c  in CNF:
c    -b^{2, 491}_2 ∨  b^{2, 491}_1 ∨  b^{2, 491}_0 ∨ false 
c  in DIMACS:
-6119  6120  6121  0

c  3 does not represent an automaton state.
c    -(-b^{2, 491}_2 ∧  b^{2, 491}_1 ∧  b^{2, 491}_0 ∧ true) 
c  in CNF:
c     b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ false 
c  in DIMACS:
 6119 -6120 -6121  0
c  -3 does not represent an automaton state.
c    -( b^{2, 491}_2 ∧  b^{2, 491}_1 ∧  b^{2, 491}_0 ∧ true) 
c  in CNF:
c    -b^{2, 491}_2 ∨ -b^{2, 491}_1 ∨ -b^{2, 491}_0 ∨ false 
c  in DIMACS:
-6119 -6120 -6121  0

c i = 492
c  -2+1 --> -1
c    ( b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧  p_984) -> ( b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0)
c  in CNF:
c    -b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨  b^{2, 493}_2
c    -b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_1
c    -b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨  b^{2, 493}_0
c  in DIMACS:
-6122 -6123  6124 -984  6125 0
-6122 -6123  6124 -984 -6126 0
-6122 -6123  6124 -984  6127 0

c  -1+1 --> 0
c    ( b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0 ∧  p_984) -> (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧ -b^{2, 493}_0)
c  in CNF:
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_2
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_1
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_0
c  in DIMACS:
-6122  6123 -6124 -984 -6125 0
-6122  6123 -6124 -984 -6126 0
-6122  6123 -6124 -984 -6127 0

c  0+1 --> 1
c    (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧  p_984) -> (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0)
c  in CNF:
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_2
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_1
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨  b^{2, 493}_0
c  in DIMACS:
 6122  6123  6124 -984 -6125 0
 6122  6123  6124 -984 -6126 0
 6122  6123  6124 -984  6127 0

c  1+1 --> 2
c    (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0 ∧  p_984) -> (-b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0)
c  in CNF:
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_2
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨  b^{2, 493}_1
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ -p_984 ∨ -b^{2, 493}_0
c  in DIMACS:
 6122  6123 -6124 -984 -6125 0
 6122  6123 -6124 -984  6126 0
 6122  6123 -6124 -984 -6127 0

c  2+1 --> break 
c    (-b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧  p_984) -> break
c  in CNF:
c     b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 6122 -6123  6124 -984 1162 0


c  2-1 --> 1
c    (-b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧ -p_984) -> (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0)
c  in CNF:
c     b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_2
c     b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_1
c     b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨  b^{2, 493}_0
c  in DIMACS:
 6122 -6123  6124  984 -6125 0
 6122 -6123  6124  984 -6126 0
 6122 -6123  6124  984  6127 0

c  1-1 --> 0
c    (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0 ∧ -p_984) -> (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧ -b^{2, 493}_0)
c  in CNF:
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_2
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_1
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_0
c  in DIMACS:
 6122  6123 -6124  984 -6125 0
 6122  6123 -6124  984 -6126 0
 6122  6123 -6124  984 -6127 0

c  0-1 --> -1
c    (-b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧ -p_984) -> ( b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0)
c  in CNF:
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨  b^{2, 493}_2
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_1
c     b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨  b^{2, 493}_0
c  in DIMACS:
 6122  6123  6124  984  6125 0
 6122  6123  6124  984 -6126 0
 6122  6123  6124  984  6127 0

c  -1-1 --> -2
c    ( b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧  b^{2, 492}_0 ∧ -p_984) -> ( b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0)
c  in CNF:
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨  b^{2, 493}_2
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨  b^{2, 493}_1
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨  p_984 ∨ -b^{2, 493}_0
c  in DIMACS:
-6122  6123 -6124  984  6125 0
-6122  6123 -6124  984  6126 0
-6122  6123 -6124  984 -6127 0

c  -2-1 --> break 
c    ( b^{2, 492}_2 ∧  b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨  b^{2, 492}_0 ∨  p_984 ∨ break
c  in DIMACS:
-6122 -6123  6124  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 492}_2 ∧ -b^{2, 492}_1 ∧ -b^{2, 492}_0 ∧ true) 
c  in CNF:
c    -b^{2, 492}_2 ∨  b^{2, 492}_1 ∨  b^{2, 492}_0 ∨ false 
c  in DIMACS:
-6122  6123  6124  0

c  3 does not represent an automaton state.
c    -(-b^{2, 492}_2 ∧  b^{2, 492}_1 ∧  b^{2, 492}_0 ∧ true) 
c  in CNF:
c     b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ false 
c  in DIMACS:
 6122 -6123 -6124  0
c  -3 does not represent an automaton state.
c    -( b^{2, 492}_2 ∧  b^{2, 492}_1 ∧  b^{2, 492}_0 ∧ true) 
c  in CNF:
c    -b^{2, 492}_2 ∨ -b^{2, 492}_1 ∨ -b^{2, 492}_0 ∨ false 
c  in DIMACS:
-6122 -6123 -6124  0

c i = 493
c  -2+1 --> -1
c    ( b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧  p_986) -> ( b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0)
c  in CNF:
c    -b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨  b^{2, 494}_2
c    -b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_1
c    -b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨  b^{2, 494}_0
c  in DIMACS:
-6125 -6126  6127 -986  6128 0
-6125 -6126  6127 -986 -6129 0
-6125 -6126  6127 -986  6130 0

c  -1+1 --> 0
c    ( b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0 ∧  p_986) -> (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧ -b^{2, 494}_0)
c  in CNF:
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_2
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_1
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_0
c  in DIMACS:
-6125  6126 -6127 -986 -6128 0
-6125  6126 -6127 -986 -6129 0
-6125  6126 -6127 -986 -6130 0

c  0+1 --> 1
c    (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧  p_986) -> (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0)
c  in CNF:
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_2
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_1
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨  b^{2, 494}_0
c  in DIMACS:
 6125  6126  6127 -986 -6128 0
 6125  6126  6127 -986 -6129 0
 6125  6126  6127 -986  6130 0

c  1+1 --> 2
c    (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0 ∧  p_986) -> (-b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0)
c  in CNF:
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_2
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨  b^{2, 494}_1
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ -p_986 ∨ -b^{2, 494}_0
c  in DIMACS:
 6125  6126 -6127 -986 -6128 0
 6125  6126 -6127 -986  6129 0
 6125  6126 -6127 -986 -6130 0

c  2+1 --> break 
c    (-b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧  p_986) -> break
c  in CNF:
c     b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 6125 -6126  6127 -986 1162 0


c  2-1 --> 1
c    (-b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧ -p_986) -> (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0)
c  in CNF:
c     b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_2
c     b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_1
c     b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨  b^{2, 494}_0
c  in DIMACS:
 6125 -6126  6127  986 -6128 0
 6125 -6126  6127  986 -6129 0
 6125 -6126  6127  986  6130 0

c  1-1 --> 0
c    (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0 ∧ -p_986) -> (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧ -b^{2, 494}_0)
c  in CNF:
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_2
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_1
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_0
c  in DIMACS:
 6125  6126 -6127  986 -6128 0
 6125  6126 -6127  986 -6129 0
 6125  6126 -6127  986 -6130 0

c  0-1 --> -1
c    (-b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧ -p_986) -> ( b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0)
c  in CNF:
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨  b^{2, 494}_2
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_1
c     b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨  b^{2, 494}_0
c  in DIMACS:
 6125  6126  6127  986  6128 0
 6125  6126  6127  986 -6129 0
 6125  6126  6127  986  6130 0

c  -1-1 --> -2
c    ( b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧  b^{2, 493}_0 ∧ -p_986) -> ( b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0)
c  in CNF:
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨  b^{2, 494}_2
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨  b^{2, 494}_1
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨  p_986 ∨ -b^{2, 494}_0
c  in DIMACS:
-6125  6126 -6127  986  6128 0
-6125  6126 -6127  986  6129 0
-6125  6126 -6127  986 -6130 0

c  -2-1 --> break 
c    ( b^{2, 493}_2 ∧  b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨  b^{2, 493}_0 ∨  p_986 ∨ break
c  in DIMACS:
-6125 -6126  6127  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 493}_2 ∧ -b^{2, 493}_1 ∧ -b^{2, 493}_0 ∧ true) 
c  in CNF:
c    -b^{2, 493}_2 ∨  b^{2, 493}_1 ∨  b^{2, 493}_0 ∨ false 
c  in DIMACS:
-6125  6126  6127  0

c  3 does not represent an automaton state.
c    -(-b^{2, 493}_2 ∧  b^{2, 493}_1 ∧  b^{2, 493}_0 ∧ true) 
c  in CNF:
c     b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ false 
c  in DIMACS:
 6125 -6126 -6127  0
c  -3 does not represent an automaton state.
c    -( b^{2, 493}_2 ∧  b^{2, 493}_1 ∧  b^{2, 493}_0 ∧ true) 
c  in CNF:
c    -b^{2, 493}_2 ∨ -b^{2, 493}_1 ∨ -b^{2, 493}_0 ∨ false 
c  in DIMACS:
-6125 -6126 -6127  0

c i = 494
c  -2+1 --> -1
c    ( b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧  p_988) -> ( b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0)
c  in CNF:
c    -b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨  b^{2, 495}_2
c    -b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_1
c    -b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨  b^{2, 495}_0
c  in DIMACS:
-6128 -6129  6130 -988  6131 0
-6128 -6129  6130 -988 -6132 0
-6128 -6129  6130 -988  6133 0

c  -1+1 --> 0
c    ( b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0 ∧  p_988) -> (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧ -b^{2, 495}_0)
c  in CNF:
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_2
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_1
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_0
c  in DIMACS:
-6128  6129 -6130 -988 -6131 0
-6128  6129 -6130 -988 -6132 0
-6128  6129 -6130 -988 -6133 0

c  0+1 --> 1
c    (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧  p_988) -> (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0)
c  in CNF:
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_2
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_1
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨  b^{2, 495}_0
c  in DIMACS:
 6128  6129  6130 -988 -6131 0
 6128  6129  6130 -988 -6132 0
 6128  6129  6130 -988  6133 0

c  1+1 --> 2
c    (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0 ∧  p_988) -> (-b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0)
c  in CNF:
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_2
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨  b^{2, 495}_1
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ -p_988 ∨ -b^{2, 495}_0
c  in DIMACS:
 6128  6129 -6130 -988 -6131 0
 6128  6129 -6130 -988  6132 0
 6128  6129 -6130 -988 -6133 0

c  2+1 --> break 
c    (-b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧  p_988) -> break
c  in CNF:
c     b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 6128 -6129  6130 -988 1162 0


c  2-1 --> 1
c    (-b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧ -p_988) -> (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0)
c  in CNF:
c     b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_2
c     b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_1
c     b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨  b^{2, 495}_0
c  in DIMACS:
 6128 -6129  6130  988 -6131 0
 6128 -6129  6130  988 -6132 0
 6128 -6129  6130  988  6133 0

c  1-1 --> 0
c    (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0 ∧ -p_988) -> (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧ -b^{2, 495}_0)
c  in CNF:
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_2
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_1
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_0
c  in DIMACS:
 6128  6129 -6130  988 -6131 0
 6128  6129 -6130  988 -6132 0
 6128  6129 -6130  988 -6133 0

c  0-1 --> -1
c    (-b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧ -p_988) -> ( b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0)
c  in CNF:
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨  b^{2, 495}_2
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_1
c     b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨  b^{2, 495}_0
c  in DIMACS:
 6128  6129  6130  988  6131 0
 6128  6129  6130  988 -6132 0
 6128  6129  6130  988  6133 0

c  -1-1 --> -2
c    ( b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧  b^{2, 494}_0 ∧ -p_988) -> ( b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0)
c  in CNF:
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨  b^{2, 495}_2
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨  b^{2, 495}_1
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨  p_988 ∨ -b^{2, 495}_0
c  in DIMACS:
-6128  6129 -6130  988  6131 0
-6128  6129 -6130  988  6132 0
-6128  6129 -6130  988 -6133 0

c  -2-1 --> break 
c    ( b^{2, 494}_2 ∧  b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨  b^{2, 494}_0 ∨  p_988 ∨ break
c  in DIMACS:
-6128 -6129  6130  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 494}_2 ∧ -b^{2, 494}_1 ∧ -b^{2, 494}_0 ∧ true) 
c  in CNF:
c    -b^{2, 494}_2 ∨  b^{2, 494}_1 ∨  b^{2, 494}_0 ∨ false 
c  in DIMACS:
-6128  6129  6130  0

c  3 does not represent an automaton state.
c    -(-b^{2, 494}_2 ∧  b^{2, 494}_1 ∧  b^{2, 494}_0 ∧ true) 
c  in CNF:
c     b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ false 
c  in DIMACS:
 6128 -6129 -6130  0
c  -3 does not represent an automaton state.
c    -( b^{2, 494}_2 ∧  b^{2, 494}_1 ∧  b^{2, 494}_0 ∧ true) 
c  in CNF:
c    -b^{2, 494}_2 ∨ -b^{2, 494}_1 ∨ -b^{2, 494}_0 ∨ false 
c  in DIMACS:
-6128 -6129 -6130  0

c i = 495
c  -2+1 --> -1
c    ( b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧  p_990) -> ( b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0)
c  in CNF:
c    -b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨  b^{2, 496}_2
c    -b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_1
c    -b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨  b^{2, 496}_0
c  in DIMACS:
-6131 -6132  6133 -990  6134 0
-6131 -6132  6133 -990 -6135 0
-6131 -6132  6133 -990  6136 0

c  -1+1 --> 0
c    ( b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0 ∧  p_990) -> (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧ -b^{2, 496}_0)
c  in CNF:
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_2
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_1
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_0
c  in DIMACS:
-6131  6132 -6133 -990 -6134 0
-6131  6132 -6133 -990 -6135 0
-6131  6132 -6133 -990 -6136 0

c  0+1 --> 1
c    (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧  p_990) -> (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0)
c  in CNF:
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_2
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_1
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨  b^{2, 496}_0
c  in DIMACS:
 6131  6132  6133 -990 -6134 0
 6131  6132  6133 -990 -6135 0
 6131  6132  6133 -990  6136 0

c  1+1 --> 2
c    (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0 ∧  p_990) -> (-b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0)
c  in CNF:
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_2
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨  b^{2, 496}_1
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ -p_990 ∨ -b^{2, 496}_0
c  in DIMACS:
 6131  6132 -6133 -990 -6134 0
 6131  6132 -6133 -990  6135 0
 6131  6132 -6133 -990 -6136 0

c  2+1 --> break 
c    (-b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧  p_990) -> break
c  in CNF:
c     b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 6131 -6132  6133 -990 1162 0


c  2-1 --> 1
c    (-b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧ -p_990) -> (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0)
c  in CNF:
c     b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_2
c     b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_1
c     b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨  b^{2, 496}_0
c  in DIMACS:
 6131 -6132  6133  990 -6134 0
 6131 -6132  6133  990 -6135 0
 6131 -6132  6133  990  6136 0

c  1-1 --> 0
c    (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0 ∧ -p_990) -> (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧ -b^{2, 496}_0)
c  in CNF:
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_2
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_1
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_0
c  in DIMACS:
 6131  6132 -6133  990 -6134 0
 6131  6132 -6133  990 -6135 0
 6131  6132 -6133  990 -6136 0

c  0-1 --> -1
c    (-b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧ -p_990) -> ( b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0)
c  in CNF:
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨  b^{2, 496}_2
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_1
c     b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨  b^{2, 496}_0
c  in DIMACS:
 6131  6132  6133  990  6134 0
 6131  6132  6133  990 -6135 0
 6131  6132  6133  990  6136 0

c  -1-1 --> -2
c    ( b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧  b^{2, 495}_0 ∧ -p_990) -> ( b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0)
c  in CNF:
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨  b^{2, 496}_2
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨  b^{2, 496}_1
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨  p_990 ∨ -b^{2, 496}_0
c  in DIMACS:
-6131  6132 -6133  990  6134 0
-6131  6132 -6133  990  6135 0
-6131  6132 -6133  990 -6136 0

c  -2-1 --> break 
c    ( b^{2, 495}_2 ∧  b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨  b^{2, 495}_0 ∨  p_990 ∨ break
c  in DIMACS:
-6131 -6132  6133  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 495}_2 ∧ -b^{2, 495}_1 ∧ -b^{2, 495}_0 ∧ true) 
c  in CNF:
c    -b^{2, 495}_2 ∨  b^{2, 495}_1 ∨  b^{2, 495}_0 ∨ false 
c  in DIMACS:
-6131  6132  6133  0

c  3 does not represent an automaton state.
c    -(-b^{2, 495}_2 ∧  b^{2, 495}_1 ∧  b^{2, 495}_0 ∧ true) 
c  in CNF:
c     b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ false 
c  in DIMACS:
 6131 -6132 -6133  0
c  -3 does not represent an automaton state.
c    -( b^{2, 495}_2 ∧  b^{2, 495}_1 ∧  b^{2, 495}_0 ∧ true) 
c  in CNF:
c    -b^{2, 495}_2 ∨ -b^{2, 495}_1 ∨ -b^{2, 495}_0 ∨ false 
c  in DIMACS:
-6131 -6132 -6133  0

c i = 496
c  -2+1 --> -1
c    ( b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧  p_992) -> ( b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0)
c  in CNF:
c    -b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨  b^{2, 497}_2
c    -b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_1
c    -b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨  b^{2, 497}_0
c  in DIMACS:
-6134 -6135  6136 -992  6137 0
-6134 -6135  6136 -992 -6138 0
-6134 -6135  6136 -992  6139 0

c  -1+1 --> 0
c    ( b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0 ∧  p_992) -> (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧ -b^{2, 497}_0)
c  in CNF:
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_2
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_1
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_0
c  in DIMACS:
-6134  6135 -6136 -992 -6137 0
-6134  6135 -6136 -992 -6138 0
-6134  6135 -6136 -992 -6139 0

c  0+1 --> 1
c    (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧  p_992) -> (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0)
c  in CNF:
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_2
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_1
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨  b^{2, 497}_0
c  in DIMACS:
 6134  6135  6136 -992 -6137 0
 6134  6135  6136 -992 -6138 0
 6134  6135  6136 -992  6139 0

c  1+1 --> 2
c    (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0 ∧  p_992) -> (-b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0)
c  in CNF:
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_2
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨  b^{2, 497}_1
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ -p_992 ∨ -b^{2, 497}_0
c  in DIMACS:
 6134  6135 -6136 -992 -6137 0
 6134  6135 -6136 -992  6138 0
 6134  6135 -6136 -992 -6139 0

c  2+1 --> break 
c    (-b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧  p_992) -> break
c  in CNF:
c     b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 6134 -6135  6136 -992 1162 0


c  2-1 --> 1
c    (-b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧ -p_992) -> (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0)
c  in CNF:
c     b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_2
c     b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_1
c     b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨  b^{2, 497}_0
c  in DIMACS:
 6134 -6135  6136  992 -6137 0
 6134 -6135  6136  992 -6138 0
 6134 -6135  6136  992  6139 0

c  1-1 --> 0
c    (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0 ∧ -p_992) -> (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧ -b^{2, 497}_0)
c  in CNF:
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_2
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_1
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_0
c  in DIMACS:
 6134  6135 -6136  992 -6137 0
 6134  6135 -6136  992 -6138 0
 6134  6135 -6136  992 -6139 0

c  0-1 --> -1
c    (-b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧ -p_992) -> ( b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0)
c  in CNF:
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨  b^{2, 497}_2
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_1
c     b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨  b^{2, 497}_0
c  in DIMACS:
 6134  6135  6136  992  6137 0
 6134  6135  6136  992 -6138 0
 6134  6135  6136  992  6139 0

c  -1-1 --> -2
c    ( b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧  b^{2, 496}_0 ∧ -p_992) -> ( b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0)
c  in CNF:
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨  b^{2, 497}_2
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨  b^{2, 497}_1
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨  p_992 ∨ -b^{2, 497}_0
c  in DIMACS:
-6134  6135 -6136  992  6137 0
-6134  6135 -6136  992  6138 0
-6134  6135 -6136  992 -6139 0

c  -2-1 --> break 
c    ( b^{2, 496}_2 ∧  b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨  b^{2, 496}_0 ∨  p_992 ∨ break
c  in DIMACS:
-6134 -6135  6136  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 496}_2 ∧ -b^{2, 496}_1 ∧ -b^{2, 496}_0 ∧ true) 
c  in CNF:
c    -b^{2, 496}_2 ∨  b^{2, 496}_1 ∨  b^{2, 496}_0 ∨ false 
c  in DIMACS:
-6134  6135  6136  0

c  3 does not represent an automaton state.
c    -(-b^{2, 496}_2 ∧  b^{2, 496}_1 ∧  b^{2, 496}_0 ∧ true) 
c  in CNF:
c     b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ false 
c  in DIMACS:
 6134 -6135 -6136  0
c  -3 does not represent an automaton state.
c    -( b^{2, 496}_2 ∧  b^{2, 496}_1 ∧  b^{2, 496}_0 ∧ true) 
c  in CNF:
c    -b^{2, 496}_2 ∨ -b^{2, 496}_1 ∨ -b^{2, 496}_0 ∨ false 
c  in DIMACS:
-6134 -6135 -6136  0

c i = 497
c  -2+1 --> -1
c    ( b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧  p_994) -> ( b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0)
c  in CNF:
c    -b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨  b^{2, 498}_2
c    -b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_1
c    -b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨  b^{2, 498}_0
c  in DIMACS:
-6137 -6138  6139 -994  6140 0
-6137 -6138  6139 -994 -6141 0
-6137 -6138  6139 -994  6142 0

c  -1+1 --> 0
c    ( b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0 ∧  p_994) -> (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧ -b^{2, 498}_0)
c  in CNF:
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_2
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_1
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_0
c  in DIMACS:
-6137  6138 -6139 -994 -6140 0
-6137  6138 -6139 -994 -6141 0
-6137  6138 -6139 -994 -6142 0

c  0+1 --> 1
c    (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧  p_994) -> (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0)
c  in CNF:
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_2
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_1
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨  b^{2, 498}_0
c  in DIMACS:
 6137  6138  6139 -994 -6140 0
 6137  6138  6139 -994 -6141 0
 6137  6138  6139 -994  6142 0

c  1+1 --> 2
c    (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0 ∧  p_994) -> (-b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0)
c  in CNF:
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_2
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨  b^{2, 498}_1
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ -p_994 ∨ -b^{2, 498}_0
c  in DIMACS:
 6137  6138 -6139 -994 -6140 0
 6137  6138 -6139 -994  6141 0
 6137  6138 -6139 -994 -6142 0

c  2+1 --> break 
c    (-b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧  p_994) -> break
c  in CNF:
c     b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 6137 -6138  6139 -994 1162 0


c  2-1 --> 1
c    (-b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧ -p_994) -> (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0)
c  in CNF:
c     b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_2
c     b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_1
c     b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨  b^{2, 498}_0
c  in DIMACS:
 6137 -6138  6139  994 -6140 0
 6137 -6138  6139  994 -6141 0
 6137 -6138  6139  994  6142 0

c  1-1 --> 0
c    (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0 ∧ -p_994) -> (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧ -b^{2, 498}_0)
c  in CNF:
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_2
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_1
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_0
c  in DIMACS:
 6137  6138 -6139  994 -6140 0
 6137  6138 -6139  994 -6141 0
 6137  6138 -6139  994 -6142 0

c  0-1 --> -1
c    (-b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧ -p_994) -> ( b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0)
c  in CNF:
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨  b^{2, 498}_2
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_1
c     b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨  b^{2, 498}_0
c  in DIMACS:
 6137  6138  6139  994  6140 0
 6137  6138  6139  994 -6141 0
 6137  6138  6139  994  6142 0

c  -1-1 --> -2
c    ( b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧  b^{2, 497}_0 ∧ -p_994) -> ( b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0)
c  in CNF:
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨  b^{2, 498}_2
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨  b^{2, 498}_1
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨  p_994 ∨ -b^{2, 498}_0
c  in DIMACS:
-6137  6138 -6139  994  6140 0
-6137  6138 -6139  994  6141 0
-6137  6138 -6139  994 -6142 0

c  -2-1 --> break 
c    ( b^{2, 497}_2 ∧  b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨  b^{2, 497}_0 ∨  p_994 ∨ break
c  in DIMACS:
-6137 -6138  6139  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 497}_2 ∧ -b^{2, 497}_1 ∧ -b^{2, 497}_0 ∧ true) 
c  in CNF:
c    -b^{2, 497}_2 ∨  b^{2, 497}_1 ∨  b^{2, 497}_0 ∨ false 
c  in DIMACS:
-6137  6138  6139  0

c  3 does not represent an automaton state.
c    -(-b^{2, 497}_2 ∧  b^{2, 497}_1 ∧  b^{2, 497}_0 ∧ true) 
c  in CNF:
c     b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ false 
c  in DIMACS:
 6137 -6138 -6139  0
c  -3 does not represent an automaton state.
c    -( b^{2, 497}_2 ∧  b^{2, 497}_1 ∧  b^{2, 497}_0 ∧ true) 
c  in CNF:
c    -b^{2, 497}_2 ∨ -b^{2, 497}_1 ∨ -b^{2, 497}_0 ∨ false 
c  in DIMACS:
-6137 -6138 -6139  0

c i = 498
c  -2+1 --> -1
c    ( b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧  p_996) -> ( b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0)
c  in CNF:
c    -b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨  b^{2, 499}_2
c    -b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_1
c    -b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨  b^{2, 499}_0
c  in DIMACS:
-6140 -6141  6142 -996  6143 0
-6140 -6141  6142 -996 -6144 0
-6140 -6141  6142 -996  6145 0

c  -1+1 --> 0
c    ( b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0 ∧  p_996) -> (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧ -b^{2, 499}_0)
c  in CNF:
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_2
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_1
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_0
c  in DIMACS:
-6140  6141 -6142 -996 -6143 0
-6140  6141 -6142 -996 -6144 0
-6140  6141 -6142 -996 -6145 0

c  0+1 --> 1
c    (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧  p_996) -> (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0)
c  in CNF:
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_2
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_1
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨  b^{2, 499}_0
c  in DIMACS:
 6140  6141  6142 -996 -6143 0
 6140  6141  6142 -996 -6144 0
 6140  6141  6142 -996  6145 0

c  1+1 --> 2
c    (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0 ∧  p_996) -> (-b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0)
c  in CNF:
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_2
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨  b^{2, 499}_1
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ -p_996 ∨ -b^{2, 499}_0
c  in DIMACS:
 6140  6141 -6142 -996 -6143 0
 6140  6141 -6142 -996  6144 0
 6140  6141 -6142 -996 -6145 0

c  2+1 --> break 
c    (-b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧  p_996) -> break
c  in CNF:
c     b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 6140 -6141  6142 -996 1162 0


c  2-1 --> 1
c    (-b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧ -p_996) -> (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0)
c  in CNF:
c     b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_2
c     b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_1
c     b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨  b^{2, 499}_0
c  in DIMACS:
 6140 -6141  6142  996 -6143 0
 6140 -6141  6142  996 -6144 0
 6140 -6141  6142  996  6145 0

c  1-1 --> 0
c    (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0 ∧ -p_996) -> (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧ -b^{2, 499}_0)
c  in CNF:
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_2
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_1
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_0
c  in DIMACS:
 6140  6141 -6142  996 -6143 0
 6140  6141 -6142  996 -6144 0
 6140  6141 -6142  996 -6145 0

c  0-1 --> -1
c    (-b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧ -p_996) -> ( b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0)
c  in CNF:
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨  b^{2, 499}_2
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_1
c     b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨  b^{2, 499}_0
c  in DIMACS:
 6140  6141  6142  996  6143 0
 6140  6141  6142  996 -6144 0
 6140  6141  6142  996  6145 0

c  -1-1 --> -2
c    ( b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧  b^{2, 498}_0 ∧ -p_996) -> ( b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0)
c  in CNF:
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨  b^{2, 499}_2
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨  b^{2, 499}_1
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨  p_996 ∨ -b^{2, 499}_0
c  in DIMACS:
-6140  6141 -6142  996  6143 0
-6140  6141 -6142  996  6144 0
-6140  6141 -6142  996 -6145 0

c  -2-1 --> break 
c    ( b^{2, 498}_2 ∧  b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨  b^{2, 498}_0 ∨  p_996 ∨ break
c  in DIMACS:
-6140 -6141  6142  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 498}_2 ∧ -b^{2, 498}_1 ∧ -b^{2, 498}_0 ∧ true) 
c  in CNF:
c    -b^{2, 498}_2 ∨  b^{2, 498}_1 ∨  b^{2, 498}_0 ∨ false 
c  in DIMACS:
-6140  6141  6142  0

c  3 does not represent an automaton state.
c    -(-b^{2, 498}_2 ∧  b^{2, 498}_1 ∧  b^{2, 498}_0 ∧ true) 
c  in CNF:
c     b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ false 
c  in DIMACS:
 6140 -6141 -6142  0
c  -3 does not represent an automaton state.
c    -( b^{2, 498}_2 ∧  b^{2, 498}_1 ∧  b^{2, 498}_0 ∧ true) 
c  in CNF:
c    -b^{2, 498}_2 ∨ -b^{2, 498}_1 ∨ -b^{2, 498}_0 ∨ false 
c  in DIMACS:
-6140 -6141 -6142  0

c i = 499
c  -2+1 --> -1
c    ( b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧  p_998) -> ( b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0)
c  in CNF:
c    -b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨  b^{2, 500}_2
c    -b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_1
c    -b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨  b^{2, 500}_0
c  in DIMACS:
-6143 -6144  6145 -998  6146 0
-6143 -6144  6145 -998 -6147 0
-6143 -6144  6145 -998  6148 0

c  -1+1 --> 0
c    ( b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0 ∧  p_998) -> (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧ -b^{2, 500}_0)
c  in CNF:
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_2
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_1
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_0
c  in DIMACS:
-6143  6144 -6145 -998 -6146 0
-6143  6144 -6145 -998 -6147 0
-6143  6144 -6145 -998 -6148 0

c  0+1 --> 1
c    (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧  p_998) -> (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0)
c  in CNF:
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_2
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_1
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨  b^{2, 500}_0
c  in DIMACS:
 6143  6144  6145 -998 -6146 0
 6143  6144  6145 -998 -6147 0
 6143  6144  6145 -998  6148 0

c  1+1 --> 2
c    (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0 ∧  p_998) -> (-b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0)
c  in CNF:
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_2
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨  b^{2, 500}_1
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ -p_998 ∨ -b^{2, 500}_0
c  in DIMACS:
 6143  6144 -6145 -998 -6146 0
 6143  6144 -6145 -998  6147 0
 6143  6144 -6145 -998 -6148 0

c  2+1 --> break 
c    (-b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧  p_998) -> break
c  in CNF:
c     b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ -p_998 ∨ break
c  in DIMACS:
 6143 -6144  6145 -998 1162 0


c  2-1 --> 1
c    (-b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧ -p_998) -> (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0)
c  in CNF:
c     b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_2
c     b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_1
c     b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨  b^{2, 500}_0
c  in DIMACS:
 6143 -6144  6145  998 -6146 0
 6143 -6144  6145  998 -6147 0
 6143 -6144  6145  998  6148 0

c  1-1 --> 0
c    (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0 ∧ -p_998) -> (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧ -b^{2, 500}_0)
c  in CNF:
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_2
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_1
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_0
c  in DIMACS:
 6143  6144 -6145  998 -6146 0
 6143  6144 -6145  998 -6147 0
 6143  6144 -6145  998 -6148 0

c  0-1 --> -1
c    (-b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧ -p_998) -> ( b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0)
c  in CNF:
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨  b^{2, 500}_2
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_1
c     b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨  b^{2, 500}_0
c  in DIMACS:
 6143  6144  6145  998  6146 0
 6143  6144  6145  998 -6147 0
 6143  6144  6145  998  6148 0

c  -1-1 --> -2
c    ( b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧  b^{2, 499}_0 ∧ -p_998) -> ( b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0)
c  in CNF:
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨  b^{2, 500}_2
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨  b^{2, 500}_1
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨  p_998 ∨ -b^{2, 500}_0
c  in DIMACS:
-6143  6144 -6145  998  6146 0
-6143  6144 -6145  998  6147 0
-6143  6144 -6145  998 -6148 0

c  -2-1 --> break 
c    ( b^{2, 499}_2 ∧  b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧ -p_998) -> break
c  in CNF:
c    -b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨  b^{2, 499}_0 ∨  p_998 ∨ break
c  in DIMACS:
-6143 -6144  6145  998 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 499}_2 ∧ -b^{2, 499}_1 ∧ -b^{2, 499}_0 ∧ true) 
c  in CNF:
c    -b^{2, 499}_2 ∨  b^{2, 499}_1 ∨  b^{2, 499}_0 ∨ false 
c  in DIMACS:
-6143  6144  6145  0

c  3 does not represent an automaton state.
c    -(-b^{2, 499}_2 ∧  b^{2, 499}_1 ∧  b^{2, 499}_0 ∧ true) 
c  in CNF:
c     b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ false 
c  in DIMACS:
 6143 -6144 -6145  0
c  -3 does not represent an automaton state.
c    -( b^{2, 499}_2 ∧  b^{2, 499}_1 ∧  b^{2, 499}_0 ∧ true) 
c  in CNF:
c    -b^{2, 499}_2 ∨ -b^{2, 499}_1 ∨ -b^{2, 499}_0 ∨ false 
c  in DIMACS:
-6143 -6144 -6145  0

c i = 500
c  -2+1 --> -1
c    ( b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧  p_1000) -> ( b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0)
c  in CNF:
c    -b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨  b^{2, 501}_2
c    -b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_1
c    -b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨  b^{2, 501}_0
c  in DIMACS:
-6146 -6147  6148 -1000  6149 0
-6146 -6147  6148 -1000 -6150 0
-6146 -6147  6148 -1000  6151 0

c  -1+1 --> 0
c    ( b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0 ∧  p_1000) -> (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧ -b^{2, 501}_0)
c  in CNF:
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_2
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_1
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_0
c  in DIMACS:
-6146  6147 -6148 -1000 -6149 0
-6146  6147 -6148 -1000 -6150 0
-6146  6147 -6148 -1000 -6151 0

c  0+1 --> 1
c    (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧  p_1000) -> (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0)
c  in CNF:
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_2
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_1
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨  b^{2, 501}_0
c  in DIMACS:
 6146  6147  6148 -1000 -6149 0
 6146  6147  6148 -1000 -6150 0
 6146  6147  6148 -1000  6151 0

c  1+1 --> 2
c    (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0 ∧  p_1000) -> (-b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0)
c  in CNF:
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_2
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨  b^{2, 501}_1
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ -p_1000 ∨ -b^{2, 501}_0
c  in DIMACS:
 6146  6147 -6148 -1000 -6149 0
 6146  6147 -6148 -1000  6150 0
 6146  6147 -6148 -1000 -6151 0

c  2+1 --> break 
c    (-b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 6146 -6147  6148 -1000 1162 0


c  2-1 --> 1
c    (-b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧ -p_1000) -> (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0)
c  in CNF:
c     b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_2
c     b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_1
c     b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨  b^{2, 501}_0
c  in DIMACS:
 6146 -6147  6148  1000 -6149 0
 6146 -6147  6148  1000 -6150 0
 6146 -6147  6148  1000  6151 0

c  1-1 --> 0
c    (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0 ∧ -p_1000) -> (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧ -b^{2, 501}_0)
c  in CNF:
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_2
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_1
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_0
c  in DIMACS:
 6146  6147 -6148  1000 -6149 0
 6146  6147 -6148  1000 -6150 0
 6146  6147 -6148  1000 -6151 0

c  0-1 --> -1
c    (-b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧ -p_1000) -> ( b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0)
c  in CNF:
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨  b^{2, 501}_2
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_1
c     b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨  b^{2, 501}_0
c  in DIMACS:
 6146  6147  6148  1000  6149 0
 6146  6147  6148  1000 -6150 0
 6146  6147  6148  1000  6151 0

c  -1-1 --> -2
c    ( b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧  b^{2, 500}_0 ∧ -p_1000) -> ( b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0)
c  in CNF:
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨  b^{2, 501}_2
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨  b^{2, 501}_1
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨  p_1000 ∨ -b^{2, 501}_0
c  in DIMACS:
-6146  6147 -6148  1000  6149 0
-6146  6147 -6148  1000  6150 0
-6146  6147 -6148  1000 -6151 0

c  -2-1 --> break 
c    ( b^{2, 500}_2 ∧  b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨  b^{2, 500}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-6146 -6147  6148  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 500}_2 ∧ -b^{2, 500}_1 ∧ -b^{2, 500}_0 ∧ true) 
c  in CNF:
c    -b^{2, 500}_2 ∨  b^{2, 500}_1 ∨  b^{2, 500}_0 ∨ false 
c  in DIMACS:
-6146  6147  6148  0

c  3 does not represent an automaton state.
c    -(-b^{2, 500}_2 ∧  b^{2, 500}_1 ∧  b^{2, 500}_0 ∧ true) 
c  in CNF:
c     b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ false 
c  in DIMACS:
 6146 -6147 -6148  0
c  -3 does not represent an automaton state.
c    -( b^{2, 500}_2 ∧  b^{2, 500}_1 ∧  b^{2, 500}_0 ∧ true) 
c  in CNF:
c    -b^{2, 500}_2 ∨ -b^{2, 500}_1 ∨ -b^{2, 500}_0 ∨ false 
c  in DIMACS:
-6146 -6147 -6148  0

c i = 501
c  -2+1 --> -1
c    ( b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧  p_1002) -> ( b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0)
c  in CNF:
c    -b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨  b^{2, 502}_2
c    -b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_1
c    -b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨  b^{2, 502}_0
c  in DIMACS:
-6149 -6150  6151 -1002  6152 0
-6149 -6150  6151 -1002 -6153 0
-6149 -6150  6151 -1002  6154 0

c  -1+1 --> 0
c    ( b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0 ∧  p_1002) -> (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧ -b^{2, 502}_0)
c  in CNF:
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_2
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_1
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_0
c  in DIMACS:
-6149  6150 -6151 -1002 -6152 0
-6149  6150 -6151 -1002 -6153 0
-6149  6150 -6151 -1002 -6154 0

c  0+1 --> 1
c    (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧  p_1002) -> (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0)
c  in CNF:
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_2
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_1
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨  b^{2, 502}_0
c  in DIMACS:
 6149  6150  6151 -1002 -6152 0
 6149  6150  6151 -1002 -6153 0
 6149  6150  6151 -1002  6154 0

c  1+1 --> 2
c    (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0 ∧  p_1002) -> (-b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0)
c  in CNF:
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_2
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨  b^{2, 502}_1
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ -p_1002 ∨ -b^{2, 502}_0
c  in DIMACS:
 6149  6150 -6151 -1002 -6152 0
 6149  6150 -6151 -1002  6153 0
 6149  6150 -6151 -1002 -6154 0

c  2+1 --> break 
c    (-b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 6149 -6150  6151 -1002 1162 0


c  2-1 --> 1
c    (-b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧ -p_1002) -> (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0)
c  in CNF:
c     b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_2
c     b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_1
c     b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨  b^{2, 502}_0
c  in DIMACS:
 6149 -6150  6151  1002 -6152 0
 6149 -6150  6151  1002 -6153 0
 6149 -6150  6151  1002  6154 0

c  1-1 --> 0
c    (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0 ∧ -p_1002) -> (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧ -b^{2, 502}_0)
c  in CNF:
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_2
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_1
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_0
c  in DIMACS:
 6149  6150 -6151  1002 -6152 0
 6149  6150 -6151  1002 -6153 0
 6149  6150 -6151  1002 -6154 0

c  0-1 --> -1
c    (-b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧ -p_1002) -> ( b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0)
c  in CNF:
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨  b^{2, 502}_2
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_1
c     b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨  b^{2, 502}_0
c  in DIMACS:
 6149  6150  6151  1002  6152 0
 6149  6150  6151  1002 -6153 0
 6149  6150  6151  1002  6154 0

c  -1-1 --> -2
c    ( b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧  b^{2, 501}_0 ∧ -p_1002) -> ( b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0)
c  in CNF:
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨  b^{2, 502}_2
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨  b^{2, 502}_1
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨  p_1002 ∨ -b^{2, 502}_0
c  in DIMACS:
-6149  6150 -6151  1002  6152 0
-6149  6150 -6151  1002  6153 0
-6149  6150 -6151  1002 -6154 0

c  -2-1 --> break 
c    ( b^{2, 501}_2 ∧  b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨  b^{2, 501}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-6149 -6150  6151  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 501}_2 ∧ -b^{2, 501}_1 ∧ -b^{2, 501}_0 ∧ true) 
c  in CNF:
c    -b^{2, 501}_2 ∨  b^{2, 501}_1 ∨  b^{2, 501}_0 ∨ false 
c  in DIMACS:
-6149  6150  6151  0

c  3 does not represent an automaton state.
c    -(-b^{2, 501}_2 ∧  b^{2, 501}_1 ∧  b^{2, 501}_0 ∧ true) 
c  in CNF:
c     b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ false 
c  in DIMACS:
 6149 -6150 -6151  0
c  -3 does not represent an automaton state.
c    -( b^{2, 501}_2 ∧  b^{2, 501}_1 ∧  b^{2, 501}_0 ∧ true) 
c  in CNF:
c    -b^{2, 501}_2 ∨ -b^{2, 501}_1 ∨ -b^{2, 501}_0 ∨ false 
c  in DIMACS:
-6149 -6150 -6151  0

c i = 502
c  -2+1 --> -1
c    ( b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧  p_1004) -> ( b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0)
c  in CNF:
c    -b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨  b^{2, 503}_2
c    -b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_1
c    -b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨  b^{2, 503}_0
c  in DIMACS:
-6152 -6153  6154 -1004  6155 0
-6152 -6153  6154 -1004 -6156 0
-6152 -6153  6154 -1004  6157 0

c  -1+1 --> 0
c    ( b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0 ∧  p_1004) -> (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧ -b^{2, 503}_0)
c  in CNF:
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_2
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_1
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_0
c  in DIMACS:
-6152  6153 -6154 -1004 -6155 0
-6152  6153 -6154 -1004 -6156 0
-6152  6153 -6154 -1004 -6157 0

c  0+1 --> 1
c    (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧  p_1004) -> (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0)
c  in CNF:
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_2
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_1
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨  b^{2, 503}_0
c  in DIMACS:
 6152  6153  6154 -1004 -6155 0
 6152  6153  6154 -1004 -6156 0
 6152  6153  6154 -1004  6157 0

c  1+1 --> 2
c    (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0 ∧  p_1004) -> (-b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0)
c  in CNF:
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_2
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨  b^{2, 503}_1
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ -p_1004 ∨ -b^{2, 503}_0
c  in DIMACS:
 6152  6153 -6154 -1004 -6155 0
 6152  6153 -6154 -1004  6156 0
 6152  6153 -6154 -1004 -6157 0

c  2+1 --> break 
c    (-b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧  p_1004) -> break
c  in CNF:
c     b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ -p_1004 ∨ break
c  in DIMACS:
 6152 -6153  6154 -1004 1162 0


c  2-1 --> 1
c    (-b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧ -p_1004) -> (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0)
c  in CNF:
c     b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_2
c     b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_1
c     b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨  b^{2, 503}_0
c  in DIMACS:
 6152 -6153  6154  1004 -6155 0
 6152 -6153  6154  1004 -6156 0
 6152 -6153  6154  1004  6157 0

c  1-1 --> 0
c    (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0 ∧ -p_1004) -> (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧ -b^{2, 503}_0)
c  in CNF:
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_2
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_1
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_0
c  in DIMACS:
 6152  6153 -6154  1004 -6155 0
 6152  6153 -6154  1004 -6156 0
 6152  6153 -6154  1004 -6157 0

c  0-1 --> -1
c    (-b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧ -p_1004) -> ( b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0)
c  in CNF:
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨  b^{2, 503}_2
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_1
c     b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨  b^{2, 503}_0
c  in DIMACS:
 6152  6153  6154  1004  6155 0
 6152  6153  6154  1004 -6156 0
 6152  6153  6154  1004  6157 0

c  -1-1 --> -2
c    ( b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧  b^{2, 502}_0 ∧ -p_1004) -> ( b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0)
c  in CNF:
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨  b^{2, 503}_2
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨  b^{2, 503}_1
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨  p_1004 ∨ -b^{2, 503}_0
c  in DIMACS:
-6152  6153 -6154  1004  6155 0
-6152  6153 -6154  1004  6156 0
-6152  6153 -6154  1004 -6157 0

c  -2-1 --> break 
c    ( b^{2, 502}_2 ∧  b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧ -p_1004) -> break
c  in CNF:
c    -b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨  b^{2, 502}_0 ∨  p_1004 ∨ break
c  in DIMACS:
-6152 -6153  6154  1004 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 502}_2 ∧ -b^{2, 502}_1 ∧ -b^{2, 502}_0 ∧ true) 
c  in CNF:
c    -b^{2, 502}_2 ∨  b^{2, 502}_1 ∨  b^{2, 502}_0 ∨ false 
c  in DIMACS:
-6152  6153  6154  0

c  3 does not represent an automaton state.
c    -(-b^{2, 502}_2 ∧  b^{2, 502}_1 ∧  b^{2, 502}_0 ∧ true) 
c  in CNF:
c     b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ false 
c  in DIMACS:
 6152 -6153 -6154  0
c  -3 does not represent an automaton state.
c    -( b^{2, 502}_2 ∧  b^{2, 502}_1 ∧  b^{2, 502}_0 ∧ true) 
c  in CNF:
c    -b^{2, 502}_2 ∨ -b^{2, 502}_1 ∨ -b^{2, 502}_0 ∨ false 
c  in DIMACS:
-6152 -6153 -6154  0

c i = 503
c  -2+1 --> -1
c    ( b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧  p_1006) -> ( b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0)
c  in CNF:
c    -b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨  b^{2, 504}_2
c    -b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_1
c    -b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨  b^{2, 504}_0
c  in DIMACS:
-6155 -6156  6157 -1006  6158 0
-6155 -6156  6157 -1006 -6159 0
-6155 -6156  6157 -1006  6160 0

c  -1+1 --> 0
c    ( b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0 ∧  p_1006) -> (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧ -b^{2, 504}_0)
c  in CNF:
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_2
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_1
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_0
c  in DIMACS:
-6155  6156 -6157 -1006 -6158 0
-6155  6156 -6157 -1006 -6159 0
-6155  6156 -6157 -1006 -6160 0

c  0+1 --> 1
c    (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧  p_1006) -> (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0)
c  in CNF:
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_2
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_1
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨  b^{2, 504}_0
c  in DIMACS:
 6155  6156  6157 -1006 -6158 0
 6155  6156  6157 -1006 -6159 0
 6155  6156  6157 -1006  6160 0

c  1+1 --> 2
c    (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0 ∧  p_1006) -> (-b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0)
c  in CNF:
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_2
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨  b^{2, 504}_1
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ -p_1006 ∨ -b^{2, 504}_0
c  in DIMACS:
 6155  6156 -6157 -1006 -6158 0
 6155  6156 -6157 -1006  6159 0
 6155  6156 -6157 -1006 -6160 0

c  2+1 --> break 
c    (-b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧  p_1006) -> break
c  in CNF:
c     b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ -p_1006 ∨ break
c  in DIMACS:
 6155 -6156  6157 -1006 1162 0


c  2-1 --> 1
c    (-b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧ -p_1006) -> (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0)
c  in CNF:
c     b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_2
c     b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_1
c     b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨  b^{2, 504}_0
c  in DIMACS:
 6155 -6156  6157  1006 -6158 0
 6155 -6156  6157  1006 -6159 0
 6155 -6156  6157  1006  6160 0

c  1-1 --> 0
c    (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0 ∧ -p_1006) -> (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧ -b^{2, 504}_0)
c  in CNF:
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_2
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_1
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_0
c  in DIMACS:
 6155  6156 -6157  1006 -6158 0
 6155  6156 -6157  1006 -6159 0
 6155  6156 -6157  1006 -6160 0

c  0-1 --> -1
c    (-b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧ -p_1006) -> ( b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0)
c  in CNF:
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨  b^{2, 504}_2
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_1
c     b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨  b^{2, 504}_0
c  in DIMACS:
 6155  6156  6157  1006  6158 0
 6155  6156  6157  1006 -6159 0
 6155  6156  6157  1006  6160 0

c  -1-1 --> -2
c    ( b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧  b^{2, 503}_0 ∧ -p_1006) -> ( b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0)
c  in CNF:
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨  b^{2, 504}_2
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨  b^{2, 504}_1
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨  p_1006 ∨ -b^{2, 504}_0
c  in DIMACS:
-6155  6156 -6157  1006  6158 0
-6155  6156 -6157  1006  6159 0
-6155  6156 -6157  1006 -6160 0

c  -2-1 --> break 
c    ( b^{2, 503}_2 ∧  b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧ -p_1006) -> break
c  in CNF:
c    -b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨  b^{2, 503}_0 ∨  p_1006 ∨ break
c  in DIMACS:
-6155 -6156  6157  1006 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 503}_2 ∧ -b^{2, 503}_1 ∧ -b^{2, 503}_0 ∧ true) 
c  in CNF:
c    -b^{2, 503}_2 ∨  b^{2, 503}_1 ∨  b^{2, 503}_0 ∨ false 
c  in DIMACS:
-6155  6156  6157  0

c  3 does not represent an automaton state.
c    -(-b^{2, 503}_2 ∧  b^{2, 503}_1 ∧  b^{2, 503}_0 ∧ true) 
c  in CNF:
c     b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ false 
c  in DIMACS:
 6155 -6156 -6157  0
c  -3 does not represent an automaton state.
c    -( b^{2, 503}_2 ∧  b^{2, 503}_1 ∧  b^{2, 503}_0 ∧ true) 
c  in CNF:
c    -b^{2, 503}_2 ∨ -b^{2, 503}_1 ∨ -b^{2, 503}_0 ∨ false 
c  in DIMACS:
-6155 -6156 -6157  0

c i = 504
c  -2+1 --> -1
c    ( b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧  p_1008) -> ( b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0)
c  in CNF:
c    -b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨  b^{2, 505}_2
c    -b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_1
c    -b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨  b^{2, 505}_0
c  in DIMACS:
-6158 -6159  6160 -1008  6161 0
-6158 -6159  6160 -1008 -6162 0
-6158 -6159  6160 -1008  6163 0

c  -1+1 --> 0
c    ( b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0 ∧  p_1008) -> (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧ -b^{2, 505}_0)
c  in CNF:
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_2
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_1
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_0
c  in DIMACS:
-6158  6159 -6160 -1008 -6161 0
-6158  6159 -6160 -1008 -6162 0
-6158  6159 -6160 -1008 -6163 0

c  0+1 --> 1
c    (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧  p_1008) -> (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0)
c  in CNF:
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_2
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_1
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨  b^{2, 505}_0
c  in DIMACS:
 6158  6159  6160 -1008 -6161 0
 6158  6159  6160 -1008 -6162 0
 6158  6159  6160 -1008  6163 0

c  1+1 --> 2
c    (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0 ∧  p_1008) -> (-b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0)
c  in CNF:
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_2
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨  b^{2, 505}_1
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ -p_1008 ∨ -b^{2, 505}_0
c  in DIMACS:
 6158  6159 -6160 -1008 -6161 0
 6158  6159 -6160 -1008  6162 0
 6158  6159 -6160 -1008 -6163 0

c  2+1 --> break 
c    (-b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 6158 -6159  6160 -1008 1162 0


c  2-1 --> 1
c    (-b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧ -p_1008) -> (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0)
c  in CNF:
c     b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_2
c     b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_1
c     b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨  b^{2, 505}_0
c  in DIMACS:
 6158 -6159  6160  1008 -6161 0
 6158 -6159  6160  1008 -6162 0
 6158 -6159  6160  1008  6163 0

c  1-1 --> 0
c    (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0 ∧ -p_1008) -> (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧ -b^{2, 505}_0)
c  in CNF:
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_2
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_1
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_0
c  in DIMACS:
 6158  6159 -6160  1008 -6161 0
 6158  6159 -6160  1008 -6162 0
 6158  6159 -6160  1008 -6163 0

c  0-1 --> -1
c    (-b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧ -p_1008) -> ( b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0)
c  in CNF:
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨  b^{2, 505}_2
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_1
c     b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨  b^{2, 505}_0
c  in DIMACS:
 6158  6159  6160  1008  6161 0
 6158  6159  6160  1008 -6162 0
 6158  6159  6160  1008  6163 0

c  -1-1 --> -2
c    ( b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧  b^{2, 504}_0 ∧ -p_1008) -> ( b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0)
c  in CNF:
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨  b^{2, 505}_2
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨  b^{2, 505}_1
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨  p_1008 ∨ -b^{2, 505}_0
c  in DIMACS:
-6158  6159 -6160  1008  6161 0
-6158  6159 -6160  1008  6162 0
-6158  6159 -6160  1008 -6163 0

c  -2-1 --> break 
c    ( b^{2, 504}_2 ∧  b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨  b^{2, 504}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-6158 -6159  6160  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 504}_2 ∧ -b^{2, 504}_1 ∧ -b^{2, 504}_0 ∧ true) 
c  in CNF:
c    -b^{2, 504}_2 ∨  b^{2, 504}_1 ∨  b^{2, 504}_0 ∨ false 
c  in DIMACS:
-6158  6159  6160  0

c  3 does not represent an automaton state.
c    -(-b^{2, 504}_2 ∧  b^{2, 504}_1 ∧  b^{2, 504}_0 ∧ true) 
c  in CNF:
c     b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ false 
c  in DIMACS:
 6158 -6159 -6160  0
c  -3 does not represent an automaton state.
c    -( b^{2, 504}_2 ∧  b^{2, 504}_1 ∧  b^{2, 504}_0 ∧ true) 
c  in CNF:
c    -b^{2, 504}_2 ∨ -b^{2, 504}_1 ∨ -b^{2, 504}_0 ∨ false 
c  in DIMACS:
-6158 -6159 -6160  0

c i = 505
c  -2+1 --> -1
c    ( b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧  p_1010) -> ( b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0)
c  in CNF:
c    -b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨  b^{2, 506}_2
c    -b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_1
c    -b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨  b^{2, 506}_0
c  in DIMACS:
-6161 -6162  6163 -1010  6164 0
-6161 -6162  6163 -1010 -6165 0
-6161 -6162  6163 -1010  6166 0

c  -1+1 --> 0
c    ( b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0 ∧  p_1010) -> (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧ -b^{2, 506}_0)
c  in CNF:
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_2
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_1
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_0
c  in DIMACS:
-6161  6162 -6163 -1010 -6164 0
-6161  6162 -6163 -1010 -6165 0
-6161  6162 -6163 -1010 -6166 0

c  0+1 --> 1
c    (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧  p_1010) -> (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0)
c  in CNF:
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_2
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_1
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨  b^{2, 506}_0
c  in DIMACS:
 6161  6162  6163 -1010 -6164 0
 6161  6162  6163 -1010 -6165 0
 6161  6162  6163 -1010  6166 0

c  1+1 --> 2
c    (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0 ∧  p_1010) -> (-b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0)
c  in CNF:
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_2
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨  b^{2, 506}_1
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ -p_1010 ∨ -b^{2, 506}_0
c  in DIMACS:
 6161  6162 -6163 -1010 -6164 0
 6161  6162 -6163 -1010  6165 0
 6161  6162 -6163 -1010 -6166 0

c  2+1 --> break 
c    (-b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 6161 -6162  6163 -1010 1162 0


c  2-1 --> 1
c    (-b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧ -p_1010) -> (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0)
c  in CNF:
c     b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_2
c     b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_1
c     b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨  b^{2, 506}_0
c  in DIMACS:
 6161 -6162  6163  1010 -6164 0
 6161 -6162  6163  1010 -6165 0
 6161 -6162  6163  1010  6166 0

c  1-1 --> 0
c    (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0 ∧ -p_1010) -> (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧ -b^{2, 506}_0)
c  in CNF:
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_2
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_1
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_0
c  in DIMACS:
 6161  6162 -6163  1010 -6164 0
 6161  6162 -6163  1010 -6165 0
 6161  6162 -6163  1010 -6166 0

c  0-1 --> -1
c    (-b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧ -p_1010) -> ( b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0)
c  in CNF:
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨  b^{2, 506}_2
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_1
c     b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨  b^{2, 506}_0
c  in DIMACS:
 6161  6162  6163  1010  6164 0
 6161  6162  6163  1010 -6165 0
 6161  6162  6163  1010  6166 0

c  -1-1 --> -2
c    ( b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧  b^{2, 505}_0 ∧ -p_1010) -> ( b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0)
c  in CNF:
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨  b^{2, 506}_2
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨  b^{2, 506}_1
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨  p_1010 ∨ -b^{2, 506}_0
c  in DIMACS:
-6161  6162 -6163  1010  6164 0
-6161  6162 -6163  1010  6165 0
-6161  6162 -6163  1010 -6166 0

c  -2-1 --> break 
c    ( b^{2, 505}_2 ∧  b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨  b^{2, 505}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-6161 -6162  6163  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 505}_2 ∧ -b^{2, 505}_1 ∧ -b^{2, 505}_0 ∧ true) 
c  in CNF:
c    -b^{2, 505}_2 ∨  b^{2, 505}_1 ∨  b^{2, 505}_0 ∨ false 
c  in DIMACS:
-6161  6162  6163  0

c  3 does not represent an automaton state.
c    -(-b^{2, 505}_2 ∧  b^{2, 505}_1 ∧  b^{2, 505}_0 ∧ true) 
c  in CNF:
c     b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ false 
c  in DIMACS:
 6161 -6162 -6163  0
c  -3 does not represent an automaton state.
c    -( b^{2, 505}_2 ∧  b^{2, 505}_1 ∧  b^{2, 505}_0 ∧ true) 
c  in CNF:
c    -b^{2, 505}_2 ∨ -b^{2, 505}_1 ∨ -b^{2, 505}_0 ∨ false 
c  in DIMACS:
-6161 -6162 -6163  0

c i = 506
c  -2+1 --> -1
c    ( b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧  p_1012) -> ( b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0)
c  in CNF:
c    -b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨  b^{2, 507}_2
c    -b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_1
c    -b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨  b^{2, 507}_0
c  in DIMACS:
-6164 -6165  6166 -1012  6167 0
-6164 -6165  6166 -1012 -6168 0
-6164 -6165  6166 -1012  6169 0

c  -1+1 --> 0
c    ( b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0 ∧  p_1012) -> (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧ -b^{2, 507}_0)
c  in CNF:
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_2
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_1
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_0
c  in DIMACS:
-6164  6165 -6166 -1012 -6167 0
-6164  6165 -6166 -1012 -6168 0
-6164  6165 -6166 -1012 -6169 0

c  0+1 --> 1
c    (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧  p_1012) -> (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0)
c  in CNF:
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_2
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_1
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨  b^{2, 507}_0
c  in DIMACS:
 6164  6165  6166 -1012 -6167 0
 6164  6165  6166 -1012 -6168 0
 6164  6165  6166 -1012  6169 0

c  1+1 --> 2
c    (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0 ∧  p_1012) -> (-b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0)
c  in CNF:
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_2
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨  b^{2, 507}_1
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ -p_1012 ∨ -b^{2, 507}_0
c  in DIMACS:
 6164  6165 -6166 -1012 -6167 0
 6164  6165 -6166 -1012  6168 0
 6164  6165 -6166 -1012 -6169 0

c  2+1 --> break 
c    (-b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 6164 -6165  6166 -1012 1162 0


c  2-1 --> 1
c    (-b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧ -p_1012) -> (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0)
c  in CNF:
c     b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_2
c     b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_1
c     b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨  b^{2, 507}_0
c  in DIMACS:
 6164 -6165  6166  1012 -6167 0
 6164 -6165  6166  1012 -6168 0
 6164 -6165  6166  1012  6169 0

c  1-1 --> 0
c    (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0 ∧ -p_1012) -> (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧ -b^{2, 507}_0)
c  in CNF:
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_2
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_1
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_0
c  in DIMACS:
 6164  6165 -6166  1012 -6167 0
 6164  6165 -6166  1012 -6168 0
 6164  6165 -6166  1012 -6169 0

c  0-1 --> -1
c    (-b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧ -p_1012) -> ( b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0)
c  in CNF:
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨  b^{2, 507}_2
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_1
c     b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨  b^{2, 507}_0
c  in DIMACS:
 6164  6165  6166  1012  6167 0
 6164  6165  6166  1012 -6168 0
 6164  6165  6166  1012  6169 0

c  -1-1 --> -2
c    ( b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧  b^{2, 506}_0 ∧ -p_1012) -> ( b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0)
c  in CNF:
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨  b^{2, 507}_2
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨  b^{2, 507}_1
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨  p_1012 ∨ -b^{2, 507}_0
c  in DIMACS:
-6164  6165 -6166  1012  6167 0
-6164  6165 -6166  1012  6168 0
-6164  6165 -6166  1012 -6169 0

c  -2-1 --> break 
c    ( b^{2, 506}_2 ∧  b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨  b^{2, 506}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-6164 -6165  6166  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 506}_2 ∧ -b^{2, 506}_1 ∧ -b^{2, 506}_0 ∧ true) 
c  in CNF:
c    -b^{2, 506}_2 ∨  b^{2, 506}_1 ∨  b^{2, 506}_0 ∨ false 
c  in DIMACS:
-6164  6165  6166  0

c  3 does not represent an automaton state.
c    -(-b^{2, 506}_2 ∧  b^{2, 506}_1 ∧  b^{2, 506}_0 ∧ true) 
c  in CNF:
c     b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ false 
c  in DIMACS:
 6164 -6165 -6166  0
c  -3 does not represent an automaton state.
c    -( b^{2, 506}_2 ∧  b^{2, 506}_1 ∧  b^{2, 506}_0 ∧ true) 
c  in CNF:
c    -b^{2, 506}_2 ∨ -b^{2, 506}_1 ∨ -b^{2, 506}_0 ∨ false 
c  in DIMACS:
-6164 -6165 -6166  0

c i = 507
c  -2+1 --> -1
c    ( b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧  p_1014) -> ( b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0)
c  in CNF:
c    -b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨  b^{2, 508}_2
c    -b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_1
c    -b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨  b^{2, 508}_0
c  in DIMACS:
-6167 -6168  6169 -1014  6170 0
-6167 -6168  6169 -1014 -6171 0
-6167 -6168  6169 -1014  6172 0

c  -1+1 --> 0
c    ( b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0 ∧  p_1014) -> (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧ -b^{2, 508}_0)
c  in CNF:
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_2
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_1
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_0
c  in DIMACS:
-6167  6168 -6169 -1014 -6170 0
-6167  6168 -6169 -1014 -6171 0
-6167  6168 -6169 -1014 -6172 0

c  0+1 --> 1
c    (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧  p_1014) -> (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0)
c  in CNF:
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_2
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_1
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨  b^{2, 508}_0
c  in DIMACS:
 6167  6168  6169 -1014 -6170 0
 6167  6168  6169 -1014 -6171 0
 6167  6168  6169 -1014  6172 0

c  1+1 --> 2
c    (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0 ∧  p_1014) -> (-b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0)
c  in CNF:
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_2
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨  b^{2, 508}_1
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ -p_1014 ∨ -b^{2, 508}_0
c  in DIMACS:
 6167  6168 -6169 -1014 -6170 0
 6167  6168 -6169 -1014  6171 0
 6167  6168 -6169 -1014 -6172 0

c  2+1 --> break 
c    (-b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 6167 -6168  6169 -1014 1162 0


c  2-1 --> 1
c    (-b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧ -p_1014) -> (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0)
c  in CNF:
c     b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_2
c     b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_1
c     b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨  b^{2, 508}_0
c  in DIMACS:
 6167 -6168  6169  1014 -6170 0
 6167 -6168  6169  1014 -6171 0
 6167 -6168  6169  1014  6172 0

c  1-1 --> 0
c    (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0 ∧ -p_1014) -> (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧ -b^{2, 508}_0)
c  in CNF:
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_2
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_1
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_0
c  in DIMACS:
 6167  6168 -6169  1014 -6170 0
 6167  6168 -6169  1014 -6171 0
 6167  6168 -6169  1014 -6172 0

c  0-1 --> -1
c    (-b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧ -p_1014) -> ( b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0)
c  in CNF:
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨  b^{2, 508}_2
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_1
c     b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨  b^{2, 508}_0
c  in DIMACS:
 6167  6168  6169  1014  6170 0
 6167  6168  6169  1014 -6171 0
 6167  6168  6169  1014  6172 0

c  -1-1 --> -2
c    ( b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧  b^{2, 507}_0 ∧ -p_1014) -> ( b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0)
c  in CNF:
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨  b^{2, 508}_2
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨  b^{2, 508}_1
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨  p_1014 ∨ -b^{2, 508}_0
c  in DIMACS:
-6167  6168 -6169  1014  6170 0
-6167  6168 -6169  1014  6171 0
-6167  6168 -6169  1014 -6172 0

c  -2-1 --> break 
c    ( b^{2, 507}_2 ∧  b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨  b^{2, 507}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-6167 -6168  6169  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 507}_2 ∧ -b^{2, 507}_1 ∧ -b^{2, 507}_0 ∧ true) 
c  in CNF:
c    -b^{2, 507}_2 ∨  b^{2, 507}_1 ∨  b^{2, 507}_0 ∨ false 
c  in DIMACS:
-6167  6168  6169  0

c  3 does not represent an automaton state.
c    -(-b^{2, 507}_2 ∧  b^{2, 507}_1 ∧  b^{2, 507}_0 ∧ true) 
c  in CNF:
c     b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ false 
c  in DIMACS:
 6167 -6168 -6169  0
c  -3 does not represent an automaton state.
c    -( b^{2, 507}_2 ∧  b^{2, 507}_1 ∧  b^{2, 507}_0 ∧ true) 
c  in CNF:
c    -b^{2, 507}_2 ∨ -b^{2, 507}_1 ∨ -b^{2, 507}_0 ∨ false 
c  in DIMACS:
-6167 -6168 -6169  0

c i = 508
c  -2+1 --> -1
c    ( b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧  p_1016) -> ( b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0)
c  in CNF:
c    -b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨  b^{2, 509}_2
c    -b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_1
c    -b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨  b^{2, 509}_0
c  in DIMACS:
-6170 -6171  6172 -1016  6173 0
-6170 -6171  6172 -1016 -6174 0
-6170 -6171  6172 -1016  6175 0

c  -1+1 --> 0
c    ( b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0 ∧  p_1016) -> (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧ -b^{2, 509}_0)
c  in CNF:
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_2
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_1
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_0
c  in DIMACS:
-6170  6171 -6172 -1016 -6173 0
-6170  6171 -6172 -1016 -6174 0
-6170  6171 -6172 -1016 -6175 0

c  0+1 --> 1
c    (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧  p_1016) -> (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0)
c  in CNF:
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_2
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_1
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨  b^{2, 509}_0
c  in DIMACS:
 6170  6171  6172 -1016 -6173 0
 6170  6171  6172 -1016 -6174 0
 6170  6171  6172 -1016  6175 0

c  1+1 --> 2
c    (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0 ∧  p_1016) -> (-b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0)
c  in CNF:
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_2
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨  b^{2, 509}_1
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ -p_1016 ∨ -b^{2, 509}_0
c  in DIMACS:
 6170  6171 -6172 -1016 -6173 0
 6170  6171 -6172 -1016  6174 0
 6170  6171 -6172 -1016 -6175 0

c  2+1 --> break 
c    (-b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 6170 -6171  6172 -1016 1162 0


c  2-1 --> 1
c    (-b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧ -p_1016) -> (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0)
c  in CNF:
c     b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_2
c     b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_1
c     b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨  b^{2, 509}_0
c  in DIMACS:
 6170 -6171  6172  1016 -6173 0
 6170 -6171  6172  1016 -6174 0
 6170 -6171  6172  1016  6175 0

c  1-1 --> 0
c    (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0 ∧ -p_1016) -> (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧ -b^{2, 509}_0)
c  in CNF:
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_2
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_1
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_0
c  in DIMACS:
 6170  6171 -6172  1016 -6173 0
 6170  6171 -6172  1016 -6174 0
 6170  6171 -6172  1016 -6175 0

c  0-1 --> -1
c    (-b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧ -p_1016) -> ( b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0)
c  in CNF:
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨  b^{2, 509}_2
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_1
c     b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨  b^{2, 509}_0
c  in DIMACS:
 6170  6171  6172  1016  6173 0
 6170  6171  6172  1016 -6174 0
 6170  6171  6172  1016  6175 0

c  -1-1 --> -2
c    ( b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧  b^{2, 508}_0 ∧ -p_1016) -> ( b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0)
c  in CNF:
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨  b^{2, 509}_2
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨  b^{2, 509}_1
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨  p_1016 ∨ -b^{2, 509}_0
c  in DIMACS:
-6170  6171 -6172  1016  6173 0
-6170  6171 -6172  1016  6174 0
-6170  6171 -6172  1016 -6175 0

c  -2-1 --> break 
c    ( b^{2, 508}_2 ∧  b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨  b^{2, 508}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-6170 -6171  6172  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 508}_2 ∧ -b^{2, 508}_1 ∧ -b^{2, 508}_0 ∧ true) 
c  in CNF:
c    -b^{2, 508}_2 ∨  b^{2, 508}_1 ∨  b^{2, 508}_0 ∨ false 
c  in DIMACS:
-6170  6171  6172  0

c  3 does not represent an automaton state.
c    -(-b^{2, 508}_2 ∧  b^{2, 508}_1 ∧  b^{2, 508}_0 ∧ true) 
c  in CNF:
c     b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ false 
c  in DIMACS:
 6170 -6171 -6172  0
c  -3 does not represent an automaton state.
c    -( b^{2, 508}_2 ∧  b^{2, 508}_1 ∧  b^{2, 508}_0 ∧ true) 
c  in CNF:
c    -b^{2, 508}_2 ∨ -b^{2, 508}_1 ∨ -b^{2, 508}_0 ∨ false 
c  in DIMACS:
-6170 -6171 -6172  0

c i = 509
c  -2+1 --> -1
c    ( b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧  p_1018) -> ( b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0)
c  in CNF:
c    -b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨  b^{2, 510}_2
c    -b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_1
c    -b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨  b^{2, 510}_0
c  in DIMACS:
-6173 -6174  6175 -1018  6176 0
-6173 -6174  6175 -1018 -6177 0
-6173 -6174  6175 -1018  6178 0

c  -1+1 --> 0
c    ( b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0 ∧  p_1018) -> (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧ -b^{2, 510}_0)
c  in CNF:
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_2
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_1
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_0
c  in DIMACS:
-6173  6174 -6175 -1018 -6176 0
-6173  6174 -6175 -1018 -6177 0
-6173  6174 -6175 -1018 -6178 0

c  0+1 --> 1
c    (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧  p_1018) -> (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0)
c  in CNF:
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_2
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_1
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨  b^{2, 510}_0
c  in DIMACS:
 6173  6174  6175 -1018 -6176 0
 6173  6174  6175 -1018 -6177 0
 6173  6174  6175 -1018  6178 0

c  1+1 --> 2
c    (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0 ∧  p_1018) -> (-b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0)
c  in CNF:
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_2
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨  b^{2, 510}_1
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ -p_1018 ∨ -b^{2, 510}_0
c  in DIMACS:
 6173  6174 -6175 -1018 -6176 0
 6173  6174 -6175 -1018  6177 0
 6173  6174 -6175 -1018 -6178 0

c  2+1 --> break 
c    (-b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧  p_1018) -> break
c  in CNF:
c     b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ -p_1018 ∨ break
c  in DIMACS:
 6173 -6174  6175 -1018 1162 0


c  2-1 --> 1
c    (-b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧ -p_1018) -> (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0)
c  in CNF:
c     b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_2
c     b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_1
c     b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨  b^{2, 510}_0
c  in DIMACS:
 6173 -6174  6175  1018 -6176 0
 6173 -6174  6175  1018 -6177 0
 6173 -6174  6175  1018  6178 0

c  1-1 --> 0
c    (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0 ∧ -p_1018) -> (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧ -b^{2, 510}_0)
c  in CNF:
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_2
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_1
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_0
c  in DIMACS:
 6173  6174 -6175  1018 -6176 0
 6173  6174 -6175  1018 -6177 0
 6173  6174 -6175  1018 -6178 0

c  0-1 --> -1
c    (-b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧ -p_1018) -> ( b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0)
c  in CNF:
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨  b^{2, 510}_2
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_1
c     b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨  b^{2, 510}_0
c  in DIMACS:
 6173  6174  6175  1018  6176 0
 6173  6174  6175  1018 -6177 0
 6173  6174  6175  1018  6178 0

c  -1-1 --> -2
c    ( b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧  b^{2, 509}_0 ∧ -p_1018) -> ( b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0)
c  in CNF:
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨  b^{2, 510}_2
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨  b^{2, 510}_1
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨  p_1018 ∨ -b^{2, 510}_0
c  in DIMACS:
-6173  6174 -6175  1018  6176 0
-6173  6174 -6175  1018  6177 0
-6173  6174 -6175  1018 -6178 0

c  -2-1 --> break 
c    ( b^{2, 509}_2 ∧  b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧ -p_1018) -> break
c  in CNF:
c    -b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨  b^{2, 509}_0 ∨  p_1018 ∨ break
c  in DIMACS:
-6173 -6174  6175  1018 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 509}_2 ∧ -b^{2, 509}_1 ∧ -b^{2, 509}_0 ∧ true) 
c  in CNF:
c    -b^{2, 509}_2 ∨  b^{2, 509}_1 ∨  b^{2, 509}_0 ∨ false 
c  in DIMACS:
-6173  6174  6175  0

c  3 does not represent an automaton state.
c    -(-b^{2, 509}_2 ∧  b^{2, 509}_1 ∧  b^{2, 509}_0 ∧ true) 
c  in CNF:
c     b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ false 
c  in DIMACS:
 6173 -6174 -6175  0
c  -3 does not represent an automaton state.
c    -( b^{2, 509}_2 ∧  b^{2, 509}_1 ∧  b^{2, 509}_0 ∧ true) 
c  in CNF:
c    -b^{2, 509}_2 ∨ -b^{2, 509}_1 ∨ -b^{2, 509}_0 ∨ false 
c  in DIMACS:
-6173 -6174 -6175  0

c i = 510
c  -2+1 --> -1
c    ( b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧  p_1020) -> ( b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0)
c  in CNF:
c    -b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨  b^{2, 511}_2
c    -b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_1
c    -b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨  b^{2, 511}_0
c  in DIMACS:
-6176 -6177  6178 -1020  6179 0
-6176 -6177  6178 -1020 -6180 0
-6176 -6177  6178 -1020  6181 0

c  -1+1 --> 0
c    ( b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0 ∧  p_1020) -> (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧ -b^{2, 511}_0)
c  in CNF:
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_2
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_1
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_0
c  in DIMACS:
-6176  6177 -6178 -1020 -6179 0
-6176  6177 -6178 -1020 -6180 0
-6176  6177 -6178 -1020 -6181 0

c  0+1 --> 1
c    (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧  p_1020) -> (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0)
c  in CNF:
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_2
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_1
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨  b^{2, 511}_0
c  in DIMACS:
 6176  6177  6178 -1020 -6179 0
 6176  6177  6178 -1020 -6180 0
 6176  6177  6178 -1020  6181 0

c  1+1 --> 2
c    (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0 ∧  p_1020) -> (-b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0)
c  in CNF:
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_2
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨  b^{2, 511}_1
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ -p_1020 ∨ -b^{2, 511}_0
c  in DIMACS:
 6176  6177 -6178 -1020 -6179 0
 6176  6177 -6178 -1020  6180 0
 6176  6177 -6178 -1020 -6181 0

c  2+1 --> break 
c    (-b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 6176 -6177  6178 -1020 1162 0


c  2-1 --> 1
c    (-b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧ -p_1020) -> (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0)
c  in CNF:
c     b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_2
c     b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_1
c     b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨  b^{2, 511}_0
c  in DIMACS:
 6176 -6177  6178  1020 -6179 0
 6176 -6177  6178  1020 -6180 0
 6176 -6177  6178  1020  6181 0

c  1-1 --> 0
c    (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0 ∧ -p_1020) -> (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧ -b^{2, 511}_0)
c  in CNF:
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_2
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_1
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_0
c  in DIMACS:
 6176  6177 -6178  1020 -6179 0
 6176  6177 -6178  1020 -6180 0
 6176  6177 -6178  1020 -6181 0

c  0-1 --> -1
c    (-b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧ -p_1020) -> ( b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0)
c  in CNF:
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨  b^{2, 511}_2
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_1
c     b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨  b^{2, 511}_0
c  in DIMACS:
 6176  6177  6178  1020  6179 0
 6176  6177  6178  1020 -6180 0
 6176  6177  6178  1020  6181 0

c  -1-1 --> -2
c    ( b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧  b^{2, 510}_0 ∧ -p_1020) -> ( b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0)
c  in CNF:
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨  b^{2, 511}_2
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨  b^{2, 511}_1
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨  p_1020 ∨ -b^{2, 511}_0
c  in DIMACS:
-6176  6177 -6178  1020  6179 0
-6176  6177 -6178  1020  6180 0
-6176  6177 -6178  1020 -6181 0

c  -2-1 --> break 
c    ( b^{2, 510}_2 ∧  b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨  b^{2, 510}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-6176 -6177  6178  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 510}_2 ∧ -b^{2, 510}_1 ∧ -b^{2, 510}_0 ∧ true) 
c  in CNF:
c    -b^{2, 510}_2 ∨  b^{2, 510}_1 ∨  b^{2, 510}_0 ∨ false 
c  in DIMACS:
-6176  6177  6178  0

c  3 does not represent an automaton state.
c    -(-b^{2, 510}_2 ∧  b^{2, 510}_1 ∧  b^{2, 510}_0 ∧ true) 
c  in CNF:
c     b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ false 
c  in DIMACS:
 6176 -6177 -6178  0
c  -3 does not represent an automaton state.
c    -( b^{2, 510}_2 ∧  b^{2, 510}_1 ∧  b^{2, 510}_0 ∧ true) 
c  in CNF:
c    -b^{2, 510}_2 ∨ -b^{2, 510}_1 ∨ -b^{2, 510}_0 ∨ false 
c  in DIMACS:
-6176 -6177 -6178  0

c i = 511
c  -2+1 --> -1
c    ( b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧  p_1022) -> ( b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0)
c  in CNF:
c    -b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨  b^{2, 512}_2
c    -b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_1
c    -b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨  b^{2, 512}_0
c  in DIMACS:
-6179 -6180  6181 -1022  6182 0
-6179 -6180  6181 -1022 -6183 0
-6179 -6180  6181 -1022  6184 0

c  -1+1 --> 0
c    ( b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0 ∧  p_1022) -> (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧ -b^{2, 512}_0)
c  in CNF:
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_2
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_1
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_0
c  in DIMACS:
-6179  6180 -6181 -1022 -6182 0
-6179  6180 -6181 -1022 -6183 0
-6179  6180 -6181 -1022 -6184 0

c  0+1 --> 1
c    (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧  p_1022) -> (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0)
c  in CNF:
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_2
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_1
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨  b^{2, 512}_0
c  in DIMACS:
 6179  6180  6181 -1022 -6182 0
 6179  6180  6181 -1022 -6183 0
 6179  6180  6181 -1022  6184 0

c  1+1 --> 2
c    (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0 ∧  p_1022) -> (-b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0)
c  in CNF:
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_2
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨  b^{2, 512}_1
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ -p_1022 ∨ -b^{2, 512}_0
c  in DIMACS:
 6179  6180 -6181 -1022 -6182 0
 6179  6180 -6181 -1022  6183 0
 6179  6180 -6181 -1022 -6184 0

c  2+1 --> break 
c    (-b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 6179 -6180  6181 -1022 1162 0


c  2-1 --> 1
c    (-b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧ -p_1022) -> (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0)
c  in CNF:
c     b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_2
c     b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_1
c     b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨  b^{2, 512}_0
c  in DIMACS:
 6179 -6180  6181  1022 -6182 0
 6179 -6180  6181  1022 -6183 0
 6179 -6180  6181  1022  6184 0

c  1-1 --> 0
c    (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0 ∧ -p_1022) -> (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧ -b^{2, 512}_0)
c  in CNF:
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_2
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_1
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_0
c  in DIMACS:
 6179  6180 -6181  1022 -6182 0
 6179  6180 -6181  1022 -6183 0
 6179  6180 -6181  1022 -6184 0

c  0-1 --> -1
c    (-b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧ -p_1022) -> ( b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0)
c  in CNF:
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨  b^{2, 512}_2
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_1
c     b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨  b^{2, 512}_0
c  in DIMACS:
 6179  6180  6181  1022  6182 0
 6179  6180  6181  1022 -6183 0
 6179  6180  6181  1022  6184 0

c  -1-1 --> -2
c    ( b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧  b^{2, 511}_0 ∧ -p_1022) -> ( b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0)
c  in CNF:
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨  b^{2, 512}_2
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨  b^{2, 512}_1
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨  p_1022 ∨ -b^{2, 512}_0
c  in DIMACS:
-6179  6180 -6181  1022  6182 0
-6179  6180 -6181  1022  6183 0
-6179  6180 -6181  1022 -6184 0

c  -2-1 --> break 
c    ( b^{2, 511}_2 ∧  b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨  b^{2, 511}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-6179 -6180  6181  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 511}_2 ∧ -b^{2, 511}_1 ∧ -b^{2, 511}_0 ∧ true) 
c  in CNF:
c    -b^{2, 511}_2 ∨  b^{2, 511}_1 ∨  b^{2, 511}_0 ∨ false 
c  in DIMACS:
-6179  6180  6181  0

c  3 does not represent an automaton state.
c    -(-b^{2, 511}_2 ∧  b^{2, 511}_1 ∧  b^{2, 511}_0 ∧ true) 
c  in CNF:
c     b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ false 
c  in DIMACS:
 6179 -6180 -6181  0
c  -3 does not represent an automaton state.
c    -( b^{2, 511}_2 ∧  b^{2, 511}_1 ∧  b^{2, 511}_0 ∧ true) 
c  in CNF:
c    -b^{2, 511}_2 ∨ -b^{2, 511}_1 ∨ -b^{2, 511}_0 ∨ false 
c  in DIMACS:
-6179 -6180 -6181  0

c i = 512
c  -2+1 --> -1
c    ( b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧  p_1024) -> ( b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0)
c  in CNF:
c    -b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨  b^{2, 513}_2
c    -b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_1
c    -b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨  b^{2, 513}_0
c  in DIMACS:
-6182 -6183  6184 -1024  6185 0
-6182 -6183  6184 -1024 -6186 0
-6182 -6183  6184 -1024  6187 0

c  -1+1 --> 0
c    ( b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0 ∧  p_1024) -> (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧ -b^{2, 513}_0)
c  in CNF:
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_2
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_1
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_0
c  in DIMACS:
-6182  6183 -6184 -1024 -6185 0
-6182  6183 -6184 -1024 -6186 0
-6182  6183 -6184 -1024 -6187 0

c  0+1 --> 1
c    (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧  p_1024) -> (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0)
c  in CNF:
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_2
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_1
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨  b^{2, 513}_0
c  in DIMACS:
 6182  6183  6184 -1024 -6185 0
 6182  6183  6184 -1024 -6186 0
 6182  6183  6184 -1024  6187 0

c  1+1 --> 2
c    (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0 ∧  p_1024) -> (-b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0)
c  in CNF:
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_2
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨  b^{2, 513}_1
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ -p_1024 ∨ -b^{2, 513}_0
c  in DIMACS:
 6182  6183 -6184 -1024 -6185 0
 6182  6183 -6184 -1024  6186 0
 6182  6183 -6184 -1024 -6187 0

c  2+1 --> break 
c    (-b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 6182 -6183  6184 -1024 1162 0


c  2-1 --> 1
c    (-b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧ -p_1024) -> (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0)
c  in CNF:
c     b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_2
c     b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_1
c     b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨  b^{2, 513}_0
c  in DIMACS:
 6182 -6183  6184  1024 -6185 0
 6182 -6183  6184  1024 -6186 0
 6182 -6183  6184  1024  6187 0

c  1-1 --> 0
c    (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0 ∧ -p_1024) -> (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧ -b^{2, 513}_0)
c  in CNF:
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_2
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_1
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_0
c  in DIMACS:
 6182  6183 -6184  1024 -6185 0
 6182  6183 -6184  1024 -6186 0
 6182  6183 -6184  1024 -6187 0

c  0-1 --> -1
c    (-b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧ -p_1024) -> ( b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0)
c  in CNF:
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨  b^{2, 513}_2
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_1
c     b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨  b^{2, 513}_0
c  in DIMACS:
 6182  6183  6184  1024  6185 0
 6182  6183  6184  1024 -6186 0
 6182  6183  6184  1024  6187 0

c  -1-1 --> -2
c    ( b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧  b^{2, 512}_0 ∧ -p_1024) -> ( b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0)
c  in CNF:
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨  b^{2, 513}_2
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨  b^{2, 513}_1
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨  p_1024 ∨ -b^{2, 513}_0
c  in DIMACS:
-6182  6183 -6184  1024  6185 0
-6182  6183 -6184  1024  6186 0
-6182  6183 -6184  1024 -6187 0

c  -2-1 --> break 
c    ( b^{2, 512}_2 ∧  b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨  b^{2, 512}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-6182 -6183  6184  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 512}_2 ∧ -b^{2, 512}_1 ∧ -b^{2, 512}_0 ∧ true) 
c  in CNF:
c    -b^{2, 512}_2 ∨  b^{2, 512}_1 ∨  b^{2, 512}_0 ∨ false 
c  in DIMACS:
-6182  6183  6184  0

c  3 does not represent an automaton state.
c    -(-b^{2, 512}_2 ∧  b^{2, 512}_1 ∧  b^{2, 512}_0 ∧ true) 
c  in CNF:
c     b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ false 
c  in DIMACS:
 6182 -6183 -6184  0
c  -3 does not represent an automaton state.
c    -( b^{2, 512}_2 ∧  b^{2, 512}_1 ∧  b^{2, 512}_0 ∧ true) 
c  in CNF:
c    -b^{2, 512}_2 ∨ -b^{2, 512}_1 ∨ -b^{2, 512}_0 ∨ false 
c  in DIMACS:
-6182 -6183 -6184  0

c i = 513
c  -2+1 --> -1
c    ( b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧  p_1026) -> ( b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0)
c  in CNF:
c    -b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨  b^{2, 514}_2
c    -b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_1
c    -b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨  b^{2, 514}_0
c  in DIMACS:
-6185 -6186  6187 -1026  6188 0
-6185 -6186  6187 -1026 -6189 0
-6185 -6186  6187 -1026  6190 0

c  -1+1 --> 0
c    ( b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0 ∧  p_1026) -> (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧ -b^{2, 514}_0)
c  in CNF:
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_2
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_1
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_0
c  in DIMACS:
-6185  6186 -6187 -1026 -6188 0
-6185  6186 -6187 -1026 -6189 0
-6185  6186 -6187 -1026 -6190 0

c  0+1 --> 1
c    (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧  p_1026) -> (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0)
c  in CNF:
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_2
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_1
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨  b^{2, 514}_0
c  in DIMACS:
 6185  6186  6187 -1026 -6188 0
 6185  6186  6187 -1026 -6189 0
 6185  6186  6187 -1026  6190 0

c  1+1 --> 2
c    (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0 ∧  p_1026) -> (-b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0)
c  in CNF:
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_2
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨  b^{2, 514}_1
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ -p_1026 ∨ -b^{2, 514}_0
c  in DIMACS:
 6185  6186 -6187 -1026 -6188 0
 6185  6186 -6187 -1026  6189 0
 6185  6186 -6187 -1026 -6190 0

c  2+1 --> break 
c    (-b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 6185 -6186  6187 -1026 1162 0


c  2-1 --> 1
c    (-b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧ -p_1026) -> (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0)
c  in CNF:
c     b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_2
c     b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_1
c     b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨  b^{2, 514}_0
c  in DIMACS:
 6185 -6186  6187  1026 -6188 0
 6185 -6186  6187  1026 -6189 0
 6185 -6186  6187  1026  6190 0

c  1-1 --> 0
c    (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0 ∧ -p_1026) -> (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧ -b^{2, 514}_0)
c  in CNF:
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_2
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_1
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_0
c  in DIMACS:
 6185  6186 -6187  1026 -6188 0
 6185  6186 -6187  1026 -6189 0
 6185  6186 -6187  1026 -6190 0

c  0-1 --> -1
c    (-b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧ -p_1026) -> ( b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0)
c  in CNF:
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨  b^{2, 514}_2
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_1
c     b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨  b^{2, 514}_0
c  in DIMACS:
 6185  6186  6187  1026  6188 0
 6185  6186  6187  1026 -6189 0
 6185  6186  6187  1026  6190 0

c  -1-1 --> -2
c    ( b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧  b^{2, 513}_0 ∧ -p_1026) -> ( b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0)
c  in CNF:
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨  b^{2, 514}_2
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨  b^{2, 514}_1
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨  p_1026 ∨ -b^{2, 514}_0
c  in DIMACS:
-6185  6186 -6187  1026  6188 0
-6185  6186 -6187  1026  6189 0
-6185  6186 -6187  1026 -6190 0

c  -2-1 --> break 
c    ( b^{2, 513}_2 ∧  b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨  b^{2, 513}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-6185 -6186  6187  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 513}_2 ∧ -b^{2, 513}_1 ∧ -b^{2, 513}_0 ∧ true) 
c  in CNF:
c    -b^{2, 513}_2 ∨  b^{2, 513}_1 ∨  b^{2, 513}_0 ∨ false 
c  in DIMACS:
-6185  6186  6187  0

c  3 does not represent an automaton state.
c    -(-b^{2, 513}_2 ∧  b^{2, 513}_1 ∧  b^{2, 513}_0 ∧ true) 
c  in CNF:
c     b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ false 
c  in DIMACS:
 6185 -6186 -6187  0
c  -3 does not represent an automaton state.
c    -( b^{2, 513}_2 ∧  b^{2, 513}_1 ∧  b^{2, 513}_0 ∧ true) 
c  in CNF:
c    -b^{2, 513}_2 ∨ -b^{2, 513}_1 ∨ -b^{2, 513}_0 ∨ false 
c  in DIMACS:
-6185 -6186 -6187  0

c i = 514
c  -2+1 --> -1
c    ( b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧  p_1028) -> ( b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0)
c  in CNF:
c    -b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨  b^{2, 515}_2
c    -b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_1
c    -b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨  b^{2, 515}_0
c  in DIMACS:
-6188 -6189  6190 -1028  6191 0
-6188 -6189  6190 -1028 -6192 0
-6188 -6189  6190 -1028  6193 0

c  -1+1 --> 0
c    ( b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0 ∧  p_1028) -> (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧ -b^{2, 515}_0)
c  in CNF:
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_2
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_1
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_0
c  in DIMACS:
-6188  6189 -6190 -1028 -6191 0
-6188  6189 -6190 -1028 -6192 0
-6188  6189 -6190 -1028 -6193 0

c  0+1 --> 1
c    (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧  p_1028) -> (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0)
c  in CNF:
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_2
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_1
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨  b^{2, 515}_0
c  in DIMACS:
 6188  6189  6190 -1028 -6191 0
 6188  6189  6190 -1028 -6192 0
 6188  6189  6190 -1028  6193 0

c  1+1 --> 2
c    (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0 ∧  p_1028) -> (-b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0)
c  in CNF:
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_2
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨  b^{2, 515}_1
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ -p_1028 ∨ -b^{2, 515}_0
c  in DIMACS:
 6188  6189 -6190 -1028 -6191 0
 6188  6189 -6190 -1028  6192 0
 6188  6189 -6190 -1028 -6193 0

c  2+1 --> break 
c    (-b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧  p_1028) -> break
c  in CNF:
c     b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ -p_1028 ∨ break
c  in DIMACS:
 6188 -6189  6190 -1028 1162 0


c  2-1 --> 1
c    (-b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧ -p_1028) -> (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0)
c  in CNF:
c     b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_2
c     b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_1
c     b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨  b^{2, 515}_0
c  in DIMACS:
 6188 -6189  6190  1028 -6191 0
 6188 -6189  6190  1028 -6192 0
 6188 -6189  6190  1028  6193 0

c  1-1 --> 0
c    (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0 ∧ -p_1028) -> (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧ -b^{2, 515}_0)
c  in CNF:
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_2
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_1
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_0
c  in DIMACS:
 6188  6189 -6190  1028 -6191 0
 6188  6189 -6190  1028 -6192 0
 6188  6189 -6190  1028 -6193 0

c  0-1 --> -1
c    (-b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧ -p_1028) -> ( b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0)
c  in CNF:
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨  b^{2, 515}_2
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_1
c     b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨  b^{2, 515}_0
c  in DIMACS:
 6188  6189  6190  1028  6191 0
 6188  6189  6190  1028 -6192 0
 6188  6189  6190  1028  6193 0

c  -1-1 --> -2
c    ( b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧  b^{2, 514}_0 ∧ -p_1028) -> ( b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0)
c  in CNF:
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨  b^{2, 515}_2
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨  b^{2, 515}_1
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨  p_1028 ∨ -b^{2, 515}_0
c  in DIMACS:
-6188  6189 -6190  1028  6191 0
-6188  6189 -6190  1028  6192 0
-6188  6189 -6190  1028 -6193 0

c  -2-1 --> break 
c    ( b^{2, 514}_2 ∧  b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧ -p_1028) -> break
c  in CNF:
c    -b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨  b^{2, 514}_0 ∨  p_1028 ∨ break
c  in DIMACS:
-6188 -6189  6190  1028 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 514}_2 ∧ -b^{2, 514}_1 ∧ -b^{2, 514}_0 ∧ true) 
c  in CNF:
c    -b^{2, 514}_2 ∨  b^{2, 514}_1 ∨  b^{2, 514}_0 ∨ false 
c  in DIMACS:
-6188  6189  6190  0

c  3 does not represent an automaton state.
c    -(-b^{2, 514}_2 ∧  b^{2, 514}_1 ∧  b^{2, 514}_0 ∧ true) 
c  in CNF:
c     b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ false 
c  in DIMACS:
 6188 -6189 -6190  0
c  -3 does not represent an automaton state.
c    -( b^{2, 514}_2 ∧  b^{2, 514}_1 ∧  b^{2, 514}_0 ∧ true) 
c  in CNF:
c    -b^{2, 514}_2 ∨ -b^{2, 514}_1 ∨ -b^{2, 514}_0 ∨ false 
c  in DIMACS:
-6188 -6189 -6190  0

c i = 515
c  -2+1 --> -1
c    ( b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧  p_1030) -> ( b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0)
c  in CNF:
c    -b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨  b^{2, 516}_2
c    -b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_1
c    -b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨  b^{2, 516}_0
c  in DIMACS:
-6191 -6192  6193 -1030  6194 0
-6191 -6192  6193 -1030 -6195 0
-6191 -6192  6193 -1030  6196 0

c  -1+1 --> 0
c    ( b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0 ∧  p_1030) -> (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧ -b^{2, 516}_0)
c  in CNF:
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_2
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_1
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_0
c  in DIMACS:
-6191  6192 -6193 -1030 -6194 0
-6191  6192 -6193 -1030 -6195 0
-6191  6192 -6193 -1030 -6196 0

c  0+1 --> 1
c    (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧  p_1030) -> (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0)
c  in CNF:
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_2
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_1
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨  b^{2, 516}_0
c  in DIMACS:
 6191  6192  6193 -1030 -6194 0
 6191  6192  6193 -1030 -6195 0
 6191  6192  6193 -1030  6196 0

c  1+1 --> 2
c    (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0 ∧  p_1030) -> (-b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0)
c  in CNF:
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_2
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨  b^{2, 516}_1
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ -p_1030 ∨ -b^{2, 516}_0
c  in DIMACS:
 6191  6192 -6193 -1030 -6194 0
 6191  6192 -6193 -1030  6195 0
 6191  6192 -6193 -1030 -6196 0

c  2+1 --> break 
c    (-b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 6191 -6192  6193 -1030 1162 0


c  2-1 --> 1
c    (-b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧ -p_1030) -> (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0)
c  in CNF:
c     b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_2
c     b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_1
c     b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨  b^{2, 516}_0
c  in DIMACS:
 6191 -6192  6193  1030 -6194 0
 6191 -6192  6193  1030 -6195 0
 6191 -6192  6193  1030  6196 0

c  1-1 --> 0
c    (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0 ∧ -p_1030) -> (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧ -b^{2, 516}_0)
c  in CNF:
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_2
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_1
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_0
c  in DIMACS:
 6191  6192 -6193  1030 -6194 0
 6191  6192 -6193  1030 -6195 0
 6191  6192 -6193  1030 -6196 0

c  0-1 --> -1
c    (-b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧ -p_1030) -> ( b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0)
c  in CNF:
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨  b^{2, 516}_2
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_1
c     b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨  b^{2, 516}_0
c  in DIMACS:
 6191  6192  6193  1030  6194 0
 6191  6192  6193  1030 -6195 0
 6191  6192  6193  1030  6196 0

c  -1-1 --> -2
c    ( b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧  b^{2, 515}_0 ∧ -p_1030) -> ( b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0)
c  in CNF:
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨  b^{2, 516}_2
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨  b^{2, 516}_1
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨  p_1030 ∨ -b^{2, 516}_0
c  in DIMACS:
-6191  6192 -6193  1030  6194 0
-6191  6192 -6193  1030  6195 0
-6191  6192 -6193  1030 -6196 0

c  -2-1 --> break 
c    ( b^{2, 515}_2 ∧  b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨  b^{2, 515}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-6191 -6192  6193  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 515}_2 ∧ -b^{2, 515}_1 ∧ -b^{2, 515}_0 ∧ true) 
c  in CNF:
c    -b^{2, 515}_2 ∨  b^{2, 515}_1 ∨  b^{2, 515}_0 ∨ false 
c  in DIMACS:
-6191  6192  6193  0

c  3 does not represent an automaton state.
c    -(-b^{2, 515}_2 ∧  b^{2, 515}_1 ∧  b^{2, 515}_0 ∧ true) 
c  in CNF:
c     b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ false 
c  in DIMACS:
 6191 -6192 -6193  0
c  -3 does not represent an automaton state.
c    -( b^{2, 515}_2 ∧  b^{2, 515}_1 ∧  b^{2, 515}_0 ∧ true) 
c  in CNF:
c    -b^{2, 515}_2 ∨ -b^{2, 515}_1 ∨ -b^{2, 515}_0 ∨ false 
c  in DIMACS:
-6191 -6192 -6193  0

c i = 516
c  -2+1 --> -1
c    ( b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧  p_1032) -> ( b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0)
c  in CNF:
c    -b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨  b^{2, 517}_2
c    -b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_1
c    -b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨  b^{2, 517}_0
c  in DIMACS:
-6194 -6195  6196 -1032  6197 0
-6194 -6195  6196 -1032 -6198 0
-6194 -6195  6196 -1032  6199 0

c  -1+1 --> 0
c    ( b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0 ∧  p_1032) -> (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧ -b^{2, 517}_0)
c  in CNF:
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_2
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_1
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_0
c  in DIMACS:
-6194  6195 -6196 -1032 -6197 0
-6194  6195 -6196 -1032 -6198 0
-6194  6195 -6196 -1032 -6199 0

c  0+1 --> 1
c    (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧  p_1032) -> (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0)
c  in CNF:
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_2
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_1
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨  b^{2, 517}_0
c  in DIMACS:
 6194  6195  6196 -1032 -6197 0
 6194  6195  6196 -1032 -6198 0
 6194  6195  6196 -1032  6199 0

c  1+1 --> 2
c    (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0 ∧  p_1032) -> (-b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0)
c  in CNF:
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_2
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨  b^{2, 517}_1
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ -p_1032 ∨ -b^{2, 517}_0
c  in DIMACS:
 6194  6195 -6196 -1032 -6197 0
 6194  6195 -6196 -1032  6198 0
 6194  6195 -6196 -1032 -6199 0

c  2+1 --> break 
c    (-b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 6194 -6195  6196 -1032 1162 0


c  2-1 --> 1
c    (-b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧ -p_1032) -> (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0)
c  in CNF:
c     b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_2
c     b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_1
c     b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨  b^{2, 517}_0
c  in DIMACS:
 6194 -6195  6196  1032 -6197 0
 6194 -6195  6196  1032 -6198 0
 6194 -6195  6196  1032  6199 0

c  1-1 --> 0
c    (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0 ∧ -p_1032) -> (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧ -b^{2, 517}_0)
c  in CNF:
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_2
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_1
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_0
c  in DIMACS:
 6194  6195 -6196  1032 -6197 0
 6194  6195 -6196  1032 -6198 0
 6194  6195 -6196  1032 -6199 0

c  0-1 --> -1
c    (-b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧ -p_1032) -> ( b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0)
c  in CNF:
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨  b^{2, 517}_2
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_1
c     b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨  b^{2, 517}_0
c  in DIMACS:
 6194  6195  6196  1032  6197 0
 6194  6195  6196  1032 -6198 0
 6194  6195  6196  1032  6199 0

c  -1-1 --> -2
c    ( b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧  b^{2, 516}_0 ∧ -p_1032) -> ( b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0)
c  in CNF:
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨  b^{2, 517}_2
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨  b^{2, 517}_1
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨  p_1032 ∨ -b^{2, 517}_0
c  in DIMACS:
-6194  6195 -6196  1032  6197 0
-6194  6195 -6196  1032  6198 0
-6194  6195 -6196  1032 -6199 0

c  -2-1 --> break 
c    ( b^{2, 516}_2 ∧  b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨  b^{2, 516}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-6194 -6195  6196  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 516}_2 ∧ -b^{2, 516}_1 ∧ -b^{2, 516}_0 ∧ true) 
c  in CNF:
c    -b^{2, 516}_2 ∨  b^{2, 516}_1 ∨  b^{2, 516}_0 ∨ false 
c  in DIMACS:
-6194  6195  6196  0

c  3 does not represent an automaton state.
c    -(-b^{2, 516}_2 ∧  b^{2, 516}_1 ∧  b^{2, 516}_0 ∧ true) 
c  in CNF:
c     b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ false 
c  in DIMACS:
 6194 -6195 -6196  0
c  -3 does not represent an automaton state.
c    -( b^{2, 516}_2 ∧  b^{2, 516}_1 ∧  b^{2, 516}_0 ∧ true) 
c  in CNF:
c    -b^{2, 516}_2 ∨ -b^{2, 516}_1 ∨ -b^{2, 516}_0 ∨ false 
c  in DIMACS:
-6194 -6195 -6196  0

c i = 517
c  -2+1 --> -1
c    ( b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧  p_1034) -> ( b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0)
c  in CNF:
c    -b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨  b^{2, 518}_2
c    -b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_1
c    -b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨  b^{2, 518}_0
c  in DIMACS:
-6197 -6198  6199 -1034  6200 0
-6197 -6198  6199 -1034 -6201 0
-6197 -6198  6199 -1034  6202 0

c  -1+1 --> 0
c    ( b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0 ∧  p_1034) -> (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧ -b^{2, 518}_0)
c  in CNF:
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_2
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_1
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_0
c  in DIMACS:
-6197  6198 -6199 -1034 -6200 0
-6197  6198 -6199 -1034 -6201 0
-6197  6198 -6199 -1034 -6202 0

c  0+1 --> 1
c    (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧  p_1034) -> (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0)
c  in CNF:
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_2
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_1
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨  b^{2, 518}_0
c  in DIMACS:
 6197  6198  6199 -1034 -6200 0
 6197  6198  6199 -1034 -6201 0
 6197  6198  6199 -1034  6202 0

c  1+1 --> 2
c    (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0 ∧  p_1034) -> (-b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0)
c  in CNF:
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_2
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨  b^{2, 518}_1
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ -p_1034 ∨ -b^{2, 518}_0
c  in DIMACS:
 6197  6198 -6199 -1034 -6200 0
 6197  6198 -6199 -1034  6201 0
 6197  6198 -6199 -1034 -6202 0

c  2+1 --> break 
c    (-b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 6197 -6198  6199 -1034 1162 0


c  2-1 --> 1
c    (-b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧ -p_1034) -> (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0)
c  in CNF:
c     b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_2
c     b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_1
c     b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨  b^{2, 518}_0
c  in DIMACS:
 6197 -6198  6199  1034 -6200 0
 6197 -6198  6199  1034 -6201 0
 6197 -6198  6199  1034  6202 0

c  1-1 --> 0
c    (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0 ∧ -p_1034) -> (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧ -b^{2, 518}_0)
c  in CNF:
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_2
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_1
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_0
c  in DIMACS:
 6197  6198 -6199  1034 -6200 0
 6197  6198 -6199  1034 -6201 0
 6197  6198 -6199  1034 -6202 0

c  0-1 --> -1
c    (-b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧ -p_1034) -> ( b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0)
c  in CNF:
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨  b^{2, 518}_2
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_1
c     b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨  b^{2, 518}_0
c  in DIMACS:
 6197  6198  6199  1034  6200 0
 6197  6198  6199  1034 -6201 0
 6197  6198  6199  1034  6202 0

c  -1-1 --> -2
c    ( b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧  b^{2, 517}_0 ∧ -p_1034) -> ( b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0)
c  in CNF:
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨  b^{2, 518}_2
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨  b^{2, 518}_1
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨  p_1034 ∨ -b^{2, 518}_0
c  in DIMACS:
-6197  6198 -6199  1034  6200 0
-6197  6198 -6199  1034  6201 0
-6197  6198 -6199  1034 -6202 0

c  -2-1 --> break 
c    ( b^{2, 517}_2 ∧  b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨  b^{2, 517}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-6197 -6198  6199  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 517}_2 ∧ -b^{2, 517}_1 ∧ -b^{2, 517}_0 ∧ true) 
c  in CNF:
c    -b^{2, 517}_2 ∨  b^{2, 517}_1 ∨  b^{2, 517}_0 ∨ false 
c  in DIMACS:
-6197  6198  6199  0

c  3 does not represent an automaton state.
c    -(-b^{2, 517}_2 ∧  b^{2, 517}_1 ∧  b^{2, 517}_0 ∧ true) 
c  in CNF:
c     b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ false 
c  in DIMACS:
 6197 -6198 -6199  0
c  -3 does not represent an automaton state.
c    -( b^{2, 517}_2 ∧  b^{2, 517}_1 ∧  b^{2, 517}_0 ∧ true) 
c  in CNF:
c    -b^{2, 517}_2 ∨ -b^{2, 517}_1 ∨ -b^{2, 517}_0 ∨ false 
c  in DIMACS:
-6197 -6198 -6199  0

c i = 518
c  -2+1 --> -1
c    ( b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧  p_1036) -> ( b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0)
c  in CNF:
c    -b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨  b^{2, 519}_2
c    -b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_1
c    -b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨  b^{2, 519}_0
c  in DIMACS:
-6200 -6201  6202 -1036  6203 0
-6200 -6201  6202 -1036 -6204 0
-6200 -6201  6202 -1036  6205 0

c  -1+1 --> 0
c    ( b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0 ∧  p_1036) -> (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧ -b^{2, 519}_0)
c  in CNF:
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_2
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_1
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_0
c  in DIMACS:
-6200  6201 -6202 -1036 -6203 0
-6200  6201 -6202 -1036 -6204 0
-6200  6201 -6202 -1036 -6205 0

c  0+1 --> 1
c    (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧  p_1036) -> (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0)
c  in CNF:
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_2
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_1
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨  b^{2, 519}_0
c  in DIMACS:
 6200  6201  6202 -1036 -6203 0
 6200  6201  6202 -1036 -6204 0
 6200  6201  6202 -1036  6205 0

c  1+1 --> 2
c    (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0 ∧  p_1036) -> (-b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0)
c  in CNF:
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_2
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨  b^{2, 519}_1
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ -p_1036 ∨ -b^{2, 519}_0
c  in DIMACS:
 6200  6201 -6202 -1036 -6203 0
 6200  6201 -6202 -1036  6204 0
 6200  6201 -6202 -1036 -6205 0

c  2+1 --> break 
c    (-b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 6200 -6201  6202 -1036 1162 0


c  2-1 --> 1
c    (-b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧ -p_1036) -> (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0)
c  in CNF:
c     b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_2
c     b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_1
c     b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨  b^{2, 519}_0
c  in DIMACS:
 6200 -6201  6202  1036 -6203 0
 6200 -6201  6202  1036 -6204 0
 6200 -6201  6202  1036  6205 0

c  1-1 --> 0
c    (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0 ∧ -p_1036) -> (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧ -b^{2, 519}_0)
c  in CNF:
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_2
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_1
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_0
c  in DIMACS:
 6200  6201 -6202  1036 -6203 0
 6200  6201 -6202  1036 -6204 0
 6200  6201 -6202  1036 -6205 0

c  0-1 --> -1
c    (-b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧ -p_1036) -> ( b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0)
c  in CNF:
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨  b^{2, 519}_2
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_1
c     b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨  b^{2, 519}_0
c  in DIMACS:
 6200  6201  6202  1036  6203 0
 6200  6201  6202  1036 -6204 0
 6200  6201  6202  1036  6205 0

c  -1-1 --> -2
c    ( b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧  b^{2, 518}_0 ∧ -p_1036) -> ( b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0)
c  in CNF:
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨  b^{2, 519}_2
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨  b^{2, 519}_1
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨  p_1036 ∨ -b^{2, 519}_0
c  in DIMACS:
-6200  6201 -6202  1036  6203 0
-6200  6201 -6202  1036  6204 0
-6200  6201 -6202  1036 -6205 0

c  -2-1 --> break 
c    ( b^{2, 518}_2 ∧  b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨  b^{2, 518}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-6200 -6201  6202  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 518}_2 ∧ -b^{2, 518}_1 ∧ -b^{2, 518}_0 ∧ true) 
c  in CNF:
c    -b^{2, 518}_2 ∨  b^{2, 518}_1 ∨  b^{2, 518}_0 ∨ false 
c  in DIMACS:
-6200  6201  6202  0

c  3 does not represent an automaton state.
c    -(-b^{2, 518}_2 ∧  b^{2, 518}_1 ∧  b^{2, 518}_0 ∧ true) 
c  in CNF:
c     b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ false 
c  in DIMACS:
 6200 -6201 -6202  0
c  -3 does not represent an automaton state.
c    -( b^{2, 518}_2 ∧  b^{2, 518}_1 ∧  b^{2, 518}_0 ∧ true) 
c  in CNF:
c    -b^{2, 518}_2 ∨ -b^{2, 518}_1 ∨ -b^{2, 518}_0 ∨ false 
c  in DIMACS:
-6200 -6201 -6202  0

c i = 519
c  -2+1 --> -1
c    ( b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧  p_1038) -> ( b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0)
c  in CNF:
c    -b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨  b^{2, 520}_2
c    -b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_1
c    -b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨  b^{2, 520}_0
c  in DIMACS:
-6203 -6204  6205 -1038  6206 0
-6203 -6204  6205 -1038 -6207 0
-6203 -6204  6205 -1038  6208 0

c  -1+1 --> 0
c    ( b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0 ∧  p_1038) -> (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧ -b^{2, 520}_0)
c  in CNF:
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_2
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_1
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_0
c  in DIMACS:
-6203  6204 -6205 -1038 -6206 0
-6203  6204 -6205 -1038 -6207 0
-6203  6204 -6205 -1038 -6208 0

c  0+1 --> 1
c    (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧  p_1038) -> (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0)
c  in CNF:
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_2
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_1
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨  b^{2, 520}_0
c  in DIMACS:
 6203  6204  6205 -1038 -6206 0
 6203  6204  6205 -1038 -6207 0
 6203  6204  6205 -1038  6208 0

c  1+1 --> 2
c    (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0 ∧  p_1038) -> (-b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0)
c  in CNF:
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_2
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨  b^{2, 520}_1
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ -p_1038 ∨ -b^{2, 520}_0
c  in DIMACS:
 6203  6204 -6205 -1038 -6206 0
 6203  6204 -6205 -1038  6207 0
 6203  6204 -6205 -1038 -6208 0

c  2+1 --> break 
c    (-b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 6203 -6204  6205 -1038 1162 0


c  2-1 --> 1
c    (-b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧ -p_1038) -> (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0)
c  in CNF:
c     b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_2
c     b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_1
c     b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨  b^{2, 520}_0
c  in DIMACS:
 6203 -6204  6205  1038 -6206 0
 6203 -6204  6205  1038 -6207 0
 6203 -6204  6205  1038  6208 0

c  1-1 --> 0
c    (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0 ∧ -p_1038) -> (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧ -b^{2, 520}_0)
c  in CNF:
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_2
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_1
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_0
c  in DIMACS:
 6203  6204 -6205  1038 -6206 0
 6203  6204 -6205  1038 -6207 0
 6203  6204 -6205  1038 -6208 0

c  0-1 --> -1
c    (-b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧ -p_1038) -> ( b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0)
c  in CNF:
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨  b^{2, 520}_2
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_1
c     b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨  b^{2, 520}_0
c  in DIMACS:
 6203  6204  6205  1038  6206 0
 6203  6204  6205  1038 -6207 0
 6203  6204  6205  1038  6208 0

c  -1-1 --> -2
c    ( b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧  b^{2, 519}_0 ∧ -p_1038) -> ( b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0)
c  in CNF:
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨  b^{2, 520}_2
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨  b^{2, 520}_1
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨  p_1038 ∨ -b^{2, 520}_0
c  in DIMACS:
-6203  6204 -6205  1038  6206 0
-6203  6204 -6205  1038  6207 0
-6203  6204 -6205  1038 -6208 0

c  -2-1 --> break 
c    ( b^{2, 519}_2 ∧  b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨  b^{2, 519}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-6203 -6204  6205  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 519}_2 ∧ -b^{2, 519}_1 ∧ -b^{2, 519}_0 ∧ true) 
c  in CNF:
c    -b^{2, 519}_2 ∨  b^{2, 519}_1 ∨  b^{2, 519}_0 ∨ false 
c  in DIMACS:
-6203  6204  6205  0

c  3 does not represent an automaton state.
c    -(-b^{2, 519}_2 ∧  b^{2, 519}_1 ∧  b^{2, 519}_0 ∧ true) 
c  in CNF:
c     b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ false 
c  in DIMACS:
 6203 -6204 -6205  0
c  -3 does not represent an automaton state.
c    -( b^{2, 519}_2 ∧  b^{2, 519}_1 ∧  b^{2, 519}_0 ∧ true) 
c  in CNF:
c    -b^{2, 519}_2 ∨ -b^{2, 519}_1 ∨ -b^{2, 519}_0 ∨ false 
c  in DIMACS:
-6203 -6204 -6205  0

c i = 520
c  -2+1 --> -1
c    ( b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧  p_1040) -> ( b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0)
c  in CNF:
c    -b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨  b^{2, 521}_2
c    -b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_1
c    -b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨  b^{2, 521}_0
c  in DIMACS:
-6206 -6207  6208 -1040  6209 0
-6206 -6207  6208 -1040 -6210 0
-6206 -6207  6208 -1040  6211 0

c  -1+1 --> 0
c    ( b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0 ∧  p_1040) -> (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧ -b^{2, 521}_0)
c  in CNF:
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_2
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_1
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_0
c  in DIMACS:
-6206  6207 -6208 -1040 -6209 0
-6206  6207 -6208 -1040 -6210 0
-6206  6207 -6208 -1040 -6211 0

c  0+1 --> 1
c    (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧  p_1040) -> (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0)
c  in CNF:
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_2
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_1
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨  b^{2, 521}_0
c  in DIMACS:
 6206  6207  6208 -1040 -6209 0
 6206  6207  6208 -1040 -6210 0
 6206  6207  6208 -1040  6211 0

c  1+1 --> 2
c    (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0 ∧  p_1040) -> (-b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0)
c  in CNF:
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_2
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨  b^{2, 521}_1
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ -p_1040 ∨ -b^{2, 521}_0
c  in DIMACS:
 6206  6207 -6208 -1040 -6209 0
 6206  6207 -6208 -1040  6210 0
 6206  6207 -6208 -1040 -6211 0

c  2+1 --> break 
c    (-b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 6206 -6207  6208 -1040 1162 0


c  2-1 --> 1
c    (-b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧ -p_1040) -> (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0)
c  in CNF:
c     b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_2
c     b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_1
c     b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨  b^{2, 521}_0
c  in DIMACS:
 6206 -6207  6208  1040 -6209 0
 6206 -6207  6208  1040 -6210 0
 6206 -6207  6208  1040  6211 0

c  1-1 --> 0
c    (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0 ∧ -p_1040) -> (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧ -b^{2, 521}_0)
c  in CNF:
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_2
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_1
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_0
c  in DIMACS:
 6206  6207 -6208  1040 -6209 0
 6206  6207 -6208  1040 -6210 0
 6206  6207 -6208  1040 -6211 0

c  0-1 --> -1
c    (-b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧ -p_1040) -> ( b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0)
c  in CNF:
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨  b^{2, 521}_2
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_1
c     b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨  b^{2, 521}_0
c  in DIMACS:
 6206  6207  6208  1040  6209 0
 6206  6207  6208  1040 -6210 0
 6206  6207  6208  1040  6211 0

c  -1-1 --> -2
c    ( b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧  b^{2, 520}_0 ∧ -p_1040) -> ( b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0)
c  in CNF:
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨  b^{2, 521}_2
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨  b^{2, 521}_1
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨  p_1040 ∨ -b^{2, 521}_0
c  in DIMACS:
-6206  6207 -6208  1040  6209 0
-6206  6207 -6208  1040  6210 0
-6206  6207 -6208  1040 -6211 0

c  -2-1 --> break 
c    ( b^{2, 520}_2 ∧  b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨  b^{2, 520}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-6206 -6207  6208  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 520}_2 ∧ -b^{2, 520}_1 ∧ -b^{2, 520}_0 ∧ true) 
c  in CNF:
c    -b^{2, 520}_2 ∨  b^{2, 520}_1 ∨  b^{2, 520}_0 ∨ false 
c  in DIMACS:
-6206  6207  6208  0

c  3 does not represent an automaton state.
c    -(-b^{2, 520}_2 ∧  b^{2, 520}_1 ∧  b^{2, 520}_0 ∧ true) 
c  in CNF:
c     b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ false 
c  in DIMACS:
 6206 -6207 -6208  0
c  -3 does not represent an automaton state.
c    -( b^{2, 520}_2 ∧  b^{2, 520}_1 ∧  b^{2, 520}_0 ∧ true) 
c  in CNF:
c    -b^{2, 520}_2 ∨ -b^{2, 520}_1 ∨ -b^{2, 520}_0 ∨ false 
c  in DIMACS:
-6206 -6207 -6208  0

c i = 521
c  -2+1 --> -1
c    ( b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧  p_1042) -> ( b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0)
c  in CNF:
c    -b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨  b^{2, 522}_2
c    -b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_1
c    -b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨  b^{2, 522}_0
c  in DIMACS:
-6209 -6210  6211 -1042  6212 0
-6209 -6210  6211 -1042 -6213 0
-6209 -6210  6211 -1042  6214 0

c  -1+1 --> 0
c    ( b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0 ∧  p_1042) -> (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧ -b^{2, 522}_0)
c  in CNF:
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_2
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_1
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_0
c  in DIMACS:
-6209  6210 -6211 -1042 -6212 0
-6209  6210 -6211 -1042 -6213 0
-6209  6210 -6211 -1042 -6214 0

c  0+1 --> 1
c    (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧  p_1042) -> (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0)
c  in CNF:
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_2
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_1
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨  b^{2, 522}_0
c  in DIMACS:
 6209  6210  6211 -1042 -6212 0
 6209  6210  6211 -1042 -6213 0
 6209  6210  6211 -1042  6214 0

c  1+1 --> 2
c    (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0 ∧  p_1042) -> (-b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0)
c  in CNF:
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_2
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨  b^{2, 522}_1
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ -p_1042 ∨ -b^{2, 522}_0
c  in DIMACS:
 6209  6210 -6211 -1042 -6212 0
 6209  6210 -6211 -1042  6213 0
 6209  6210 -6211 -1042 -6214 0

c  2+1 --> break 
c    (-b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧  p_1042) -> break
c  in CNF:
c     b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ -p_1042 ∨ break
c  in DIMACS:
 6209 -6210  6211 -1042 1162 0


c  2-1 --> 1
c    (-b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧ -p_1042) -> (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0)
c  in CNF:
c     b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_2
c     b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_1
c     b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨  b^{2, 522}_0
c  in DIMACS:
 6209 -6210  6211  1042 -6212 0
 6209 -6210  6211  1042 -6213 0
 6209 -6210  6211  1042  6214 0

c  1-1 --> 0
c    (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0 ∧ -p_1042) -> (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧ -b^{2, 522}_0)
c  in CNF:
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_2
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_1
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_0
c  in DIMACS:
 6209  6210 -6211  1042 -6212 0
 6209  6210 -6211  1042 -6213 0
 6209  6210 -6211  1042 -6214 0

c  0-1 --> -1
c    (-b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧ -p_1042) -> ( b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0)
c  in CNF:
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨  b^{2, 522}_2
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_1
c     b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨  b^{2, 522}_0
c  in DIMACS:
 6209  6210  6211  1042  6212 0
 6209  6210  6211  1042 -6213 0
 6209  6210  6211  1042  6214 0

c  -1-1 --> -2
c    ( b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧  b^{2, 521}_0 ∧ -p_1042) -> ( b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0)
c  in CNF:
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨  b^{2, 522}_2
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨  b^{2, 522}_1
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨  p_1042 ∨ -b^{2, 522}_0
c  in DIMACS:
-6209  6210 -6211  1042  6212 0
-6209  6210 -6211  1042  6213 0
-6209  6210 -6211  1042 -6214 0

c  -2-1 --> break 
c    ( b^{2, 521}_2 ∧  b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧ -p_1042) -> break
c  in CNF:
c    -b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨  b^{2, 521}_0 ∨  p_1042 ∨ break
c  in DIMACS:
-6209 -6210  6211  1042 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 521}_2 ∧ -b^{2, 521}_1 ∧ -b^{2, 521}_0 ∧ true) 
c  in CNF:
c    -b^{2, 521}_2 ∨  b^{2, 521}_1 ∨  b^{2, 521}_0 ∨ false 
c  in DIMACS:
-6209  6210  6211  0

c  3 does not represent an automaton state.
c    -(-b^{2, 521}_2 ∧  b^{2, 521}_1 ∧  b^{2, 521}_0 ∧ true) 
c  in CNF:
c     b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ false 
c  in DIMACS:
 6209 -6210 -6211  0
c  -3 does not represent an automaton state.
c    -( b^{2, 521}_2 ∧  b^{2, 521}_1 ∧  b^{2, 521}_0 ∧ true) 
c  in CNF:
c    -b^{2, 521}_2 ∨ -b^{2, 521}_1 ∨ -b^{2, 521}_0 ∨ false 
c  in DIMACS:
-6209 -6210 -6211  0

c i = 522
c  -2+1 --> -1
c    ( b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧  p_1044) -> ( b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0)
c  in CNF:
c    -b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨  b^{2, 523}_2
c    -b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_1
c    -b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨  b^{2, 523}_0
c  in DIMACS:
-6212 -6213  6214 -1044  6215 0
-6212 -6213  6214 -1044 -6216 0
-6212 -6213  6214 -1044  6217 0

c  -1+1 --> 0
c    ( b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0 ∧  p_1044) -> (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧ -b^{2, 523}_0)
c  in CNF:
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_2
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_1
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_0
c  in DIMACS:
-6212  6213 -6214 -1044 -6215 0
-6212  6213 -6214 -1044 -6216 0
-6212  6213 -6214 -1044 -6217 0

c  0+1 --> 1
c    (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧  p_1044) -> (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0)
c  in CNF:
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_2
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_1
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨  b^{2, 523}_0
c  in DIMACS:
 6212  6213  6214 -1044 -6215 0
 6212  6213  6214 -1044 -6216 0
 6212  6213  6214 -1044  6217 0

c  1+1 --> 2
c    (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0 ∧  p_1044) -> (-b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0)
c  in CNF:
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_2
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨  b^{2, 523}_1
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ -p_1044 ∨ -b^{2, 523}_0
c  in DIMACS:
 6212  6213 -6214 -1044 -6215 0
 6212  6213 -6214 -1044  6216 0
 6212  6213 -6214 -1044 -6217 0

c  2+1 --> break 
c    (-b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 6212 -6213  6214 -1044 1162 0


c  2-1 --> 1
c    (-b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧ -p_1044) -> (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0)
c  in CNF:
c     b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_2
c     b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_1
c     b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨  b^{2, 523}_0
c  in DIMACS:
 6212 -6213  6214  1044 -6215 0
 6212 -6213  6214  1044 -6216 0
 6212 -6213  6214  1044  6217 0

c  1-1 --> 0
c    (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0 ∧ -p_1044) -> (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧ -b^{2, 523}_0)
c  in CNF:
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_2
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_1
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_0
c  in DIMACS:
 6212  6213 -6214  1044 -6215 0
 6212  6213 -6214  1044 -6216 0
 6212  6213 -6214  1044 -6217 0

c  0-1 --> -1
c    (-b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧ -p_1044) -> ( b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0)
c  in CNF:
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨  b^{2, 523}_2
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_1
c     b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨  b^{2, 523}_0
c  in DIMACS:
 6212  6213  6214  1044  6215 0
 6212  6213  6214  1044 -6216 0
 6212  6213  6214  1044  6217 0

c  -1-1 --> -2
c    ( b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧  b^{2, 522}_0 ∧ -p_1044) -> ( b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0)
c  in CNF:
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨  b^{2, 523}_2
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨  b^{2, 523}_1
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨  p_1044 ∨ -b^{2, 523}_0
c  in DIMACS:
-6212  6213 -6214  1044  6215 0
-6212  6213 -6214  1044  6216 0
-6212  6213 -6214  1044 -6217 0

c  -2-1 --> break 
c    ( b^{2, 522}_2 ∧  b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨  b^{2, 522}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-6212 -6213  6214  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 522}_2 ∧ -b^{2, 522}_1 ∧ -b^{2, 522}_0 ∧ true) 
c  in CNF:
c    -b^{2, 522}_2 ∨  b^{2, 522}_1 ∨  b^{2, 522}_0 ∨ false 
c  in DIMACS:
-6212  6213  6214  0

c  3 does not represent an automaton state.
c    -(-b^{2, 522}_2 ∧  b^{2, 522}_1 ∧  b^{2, 522}_0 ∧ true) 
c  in CNF:
c     b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ false 
c  in DIMACS:
 6212 -6213 -6214  0
c  -3 does not represent an automaton state.
c    -( b^{2, 522}_2 ∧  b^{2, 522}_1 ∧  b^{2, 522}_0 ∧ true) 
c  in CNF:
c    -b^{2, 522}_2 ∨ -b^{2, 522}_1 ∨ -b^{2, 522}_0 ∨ false 
c  in DIMACS:
-6212 -6213 -6214  0

c i = 523
c  -2+1 --> -1
c    ( b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧  p_1046) -> ( b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0)
c  in CNF:
c    -b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨  b^{2, 524}_2
c    -b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_1
c    -b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨  b^{2, 524}_0
c  in DIMACS:
-6215 -6216  6217 -1046  6218 0
-6215 -6216  6217 -1046 -6219 0
-6215 -6216  6217 -1046  6220 0

c  -1+1 --> 0
c    ( b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0 ∧  p_1046) -> (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧ -b^{2, 524}_0)
c  in CNF:
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_2
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_1
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_0
c  in DIMACS:
-6215  6216 -6217 -1046 -6218 0
-6215  6216 -6217 -1046 -6219 0
-6215  6216 -6217 -1046 -6220 0

c  0+1 --> 1
c    (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧  p_1046) -> (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0)
c  in CNF:
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_2
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_1
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨  b^{2, 524}_0
c  in DIMACS:
 6215  6216  6217 -1046 -6218 0
 6215  6216  6217 -1046 -6219 0
 6215  6216  6217 -1046  6220 0

c  1+1 --> 2
c    (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0 ∧  p_1046) -> (-b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0)
c  in CNF:
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_2
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨  b^{2, 524}_1
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ -p_1046 ∨ -b^{2, 524}_0
c  in DIMACS:
 6215  6216 -6217 -1046 -6218 0
 6215  6216 -6217 -1046  6219 0
 6215  6216 -6217 -1046 -6220 0

c  2+1 --> break 
c    (-b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧  p_1046) -> break
c  in CNF:
c     b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ -p_1046 ∨ break
c  in DIMACS:
 6215 -6216  6217 -1046 1162 0


c  2-1 --> 1
c    (-b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧ -p_1046) -> (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0)
c  in CNF:
c     b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_2
c     b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_1
c     b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨  b^{2, 524}_0
c  in DIMACS:
 6215 -6216  6217  1046 -6218 0
 6215 -6216  6217  1046 -6219 0
 6215 -6216  6217  1046  6220 0

c  1-1 --> 0
c    (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0 ∧ -p_1046) -> (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧ -b^{2, 524}_0)
c  in CNF:
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_2
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_1
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_0
c  in DIMACS:
 6215  6216 -6217  1046 -6218 0
 6215  6216 -6217  1046 -6219 0
 6215  6216 -6217  1046 -6220 0

c  0-1 --> -1
c    (-b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧ -p_1046) -> ( b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0)
c  in CNF:
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨  b^{2, 524}_2
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_1
c     b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨  b^{2, 524}_0
c  in DIMACS:
 6215  6216  6217  1046  6218 0
 6215  6216  6217  1046 -6219 0
 6215  6216  6217  1046  6220 0

c  -1-1 --> -2
c    ( b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧  b^{2, 523}_0 ∧ -p_1046) -> ( b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0)
c  in CNF:
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨  b^{2, 524}_2
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨  b^{2, 524}_1
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨  p_1046 ∨ -b^{2, 524}_0
c  in DIMACS:
-6215  6216 -6217  1046  6218 0
-6215  6216 -6217  1046  6219 0
-6215  6216 -6217  1046 -6220 0

c  -2-1 --> break 
c    ( b^{2, 523}_2 ∧  b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧ -p_1046) -> break
c  in CNF:
c    -b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨  b^{2, 523}_0 ∨  p_1046 ∨ break
c  in DIMACS:
-6215 -6216  6217  1046 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 523}_2 ∧ -b^{2, 523}_1 ∧ -b^{2, 523}_0 ∧ true) 
c  in CNF:
c    -b^{2, 523}_2 ∨  b^{2, 523}_1 ∨  b^{2, 523}_0 ∨ false 
c  in DIMACS:
-6215  6216  6217  0

c  3 does not represent an automaton state.
c    -(-b^{2, 523}_2 ∧  b^{2, 523}_1 ∧  b^{2, 523}_0 ∧ true) 
c  in CNF:
c     b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ false 
c  in DIMACS:
 6215 -6216 -6217  0
c  -3 does not represent an automaton state.
c    -( b^{2, 523}_2 ∧  b^{2, 523}_1 ∧  b^{2, 523}_0 ∧ true) 
c  in CNF:
c    -b^{2, 523}_2 ∨ -b^{2, 523}_1 ∨ -b^{2, 523}_0 ∨ false 
c  in DIMACS:
-6215 -6216 -6217  0

c i = 524
c  -2+1 --> -1
c    ( b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧  p_1048) -> ( b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0)
c  in CNF:
c    -b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨  b^{2, 525}_2
c    -b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_1
c    -b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨  b^{2, 525}_0
c  in DIMACS:
-6218 -6219  6220 -1048  6221 0
-6218 -6219  6220 -1048 -6222 0
-6218 -6219  6220 -1048  6223 0

c  -1+1 --> 0
c    ( b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0 ∧  p_1048) -> (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧ -b^{2, 525}_0)
c  in CNF:
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_2
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_1
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_0
c  in DIMACS:
-6218  6219 -6220 -1048 -6221 0
-6218  6219 -6220 -1048 -6222 0
-6218  6219 -6220 -1048 -6223 0

c  0+1 --> 1
c    (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧  p_1048) -> (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0)
c  in CNF:
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_2
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_1
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨  b^{2, 525}_0
c  in DIMACS:
 6218  6219  6220 -1048 -6221 0
 6218  6219  6220 -1048 -6222 0
 6218  6219  6220 -1048  6223 0

c  1+1 --> 2
c    (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0 ∧  p_1048) -> (-b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0)
c  in CNF:
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_2
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨  b^{2, 525}_1
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ -p_1048 ∨ -b^{2, 525}_0
c  in DIMACS:
 6218  6219 -6220 -1048 -6221 0
 6218  6219 -6220 -1048  6222 0
 6218  6219 -6220 -1048 -6223 0

c  2+1 --> break 
c    (-b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 6218 -6219  6220 -1048 1162 0


c  2-1 --> 1
c    (-b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧ -p_1048) -> (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0)
c  in CNF:
c     b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_2
c     b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_1
c     b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨  b^{2, 525}_0
c  in DIMACS:
 6218 -6219  6220  1048 -6221 0
 6218 -6219  6220  1048 -6222 0
 6218 -6219  6220  1048  6223 0

c  1-1 --> 0
c    (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0 ∧ -p_1048) -> (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧ -b^{2, 525}_0)
c  in CNF:
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_2
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_1
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_0
c  in DIMACS:
 6218  6219 -6220  1048 -6221 0
 6218  6219 -6220  1048 -6222 0
 6218  6219 -6220  1048 -6223 0

c  0-1 --> -1
c    (-b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧ -p_1048) -> ( b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0)
c  in CNF:
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨  b^{2, 525}_2
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_1
c     b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨  b^{2, 525}_0
c  in DIMACS:
 6218  6219  6220  1048  6221 0
 6218  6219  6220  1048 -6222 0
 6218  6219  6220  1048  6223 0

c  -1-1 --> -2
c    ( b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧  b^{2, 524}_0 ∧ -p_1048) -> ( b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0)
c  in CNF:
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨  b^{2, 525}_2
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨  b^{2, 525}_1
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨  p_1048 ∨ -b^{2, 525}_0
c  in DIMACS:
-6218  6219 -6220  1048  6221 0
-6218  6219 -6220  1048  6222 0
-6218  6219 -6220  1048 -6223 0

c  -2-1 --> break 
c    ( b^{2, 524}_2 ∧  b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨  b^{2, 524}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-6218 -6219  6220  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 524}_2 ∧ -b^{2, 524}_1 ∧ -b^{2, 524}_0 ∧ true) 
c  in CNF:
c    -b^{2, 524}_2 ∨  b^{2, 524}_1 ∨  b^{2, 524}_0 ∨ false 
c  in DIMACS:
-6218  6219  6220  0

c  3 does not represent an automaton state.
c    -(-b^{2, 524}_2 ∧  b^{2, 524}_1 ∧  b^{2, 524}_0 ∧ true) 
c  in CNF:
c     b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ false 
c  in DIMACS:
 6218 -6219 -6220  0
c  -3 does not represent an automaton state.
c    -( b^{2, 524}_2 ∧  b^{2, 524}_1 ∧  b^{2, 524}_0 ∧ true) 
c  in CNF:
c    -b^{2, 524}_2 ∨ -b^{2, 524}_1 ∨ -b^{2, 524}_0 ∨ false 
c  in DIMACS:
-6218 -6219 -6220  0

c i = 525
c  -2+1 --> -1
c    ( b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧  p_1050) -> ( b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0)
c  in CNF:
c    -b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨  b^{2, 526}_2
c    -b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_1
c    -b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨  b^{2, 526}_0
c  in DIMACS:
-6221 -6222  6223 -1050  6224 0
-6221 -6222  6223 -1050 -6225 0
-6221 -6222  6223 -1050  6226 0

c  -1+1 --> 0
c    ( b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0 ∧  p_1050) -> (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧ -b^{2, 526}_0)
c  in CNF:
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_2
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_1
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_0
c  in DIMACS:
-6221  6222 -6223 -1050 -6224 0
-6221  6222 -6223 -1050 -6225 0
-6221  6222 -6223 -1050 -6226 0

c  0+1 --> 1
c    (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧  p_1050) -> (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0)
c  in CNF:
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_2
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_1
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨  b^{2, 526}_0
c  in DIMACS:
 6221  6222  6223 -1050 -6224 0
 6221  6222  6223 -1050 -6225 0
 6221  6222  6223 -1050  6226 0

c  1+1 --> 2
c    (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0 ∧  p_1050) -> (-b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0)
c  in CNF:
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_2
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨  b^{2, 526}_1
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ -p_1050 ∨ -b^{2, 526}_0
c  in DIMACS:
 6221  6222 -6223 -1050 -6224 0
 6221  6222 -6223 -1050  6225 0
 6221  6222 -6223 -1050 -6226 0

c  2+1 --> break 
c    (-b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 6221 -6222  6223 -1050 1162 0


c  2-1 --> 1
c    (-b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧ -p_1050) -> (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0)
c  in CNF:
c     b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_2
c     b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_1
c     b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨  b^{2, 526}_0
c  in DIMACS:
 6221 -6222  6223  1050 -6224 0
 6221 -6222  6223  1050 -6225 0
 6221 -6222  6223  1050  6226 0

c  1-1 --> 0
c    (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0 ∧ -p_1050) -> (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧ -b^{2, 526}_0)
c  in CNF:
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_2
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_1
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_0
c  in DIMACS:
 6221  6222 -6223  1050 -6224 0
 6221  6222 -6223  1050 -6225 0
 6221  6222 -6223  1050 -6226 0

c  0-1 --> -1
c    (-b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧ -p_1050) -> ( b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0)
c  in CNF:
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨  b^{2, 526}_2
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_1
c     b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨  b^{2, 526}_0
c  in DIMACS:
 6221  6222  6223  1050  6224 0
 6221  6222  6223  1050 -6225 0
 6221  6222  6223  1050  6226 0

c  -1-1 --> -2
c    ( b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧  b^{2, 525}_0 ∧ -p_1050) -> ( b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0)
c  in CNF:
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨  b^{2, 526}_2
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨  b^{2, 526}_1
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨  p_1050 ∨ -b^{2, 526}_0
c  in DIMACS:
-6221  6222 -6223  1050  6224 0
-6221  6222 -6223  1050  6225 0
-6221  6222 -6223  1050 -6226 0

c  -2-1 --> break 
c    ( b^{2, 525}_2 ∧  b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨  b^{2, 525}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-6221 -6222  6223  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 525}_2 ∧ -b^{2, 525}_1 ∧ -b^{2, 525}_0 ∧ true) 
c  in CNF:
c    -b^{2, 525}_2 ∨  b^{2, 525}_1 ∨  b^{2, 525}_0 ∨ false 
c  in DIMACS:
-6221  6222  6223  0

c  3 does not represent an automaton state.
c    -(-b^{2, 525}_2 ∧  b^{2, 525}_1 ∧  b^{2, 525}_0 ∧ true) 
c  in CNF:
c     b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ false 
c  in DIMACS:
 6221 -6222 -6223  0
c  -3 does not represent an automaton state.
c    -( b^{2, 525}_2 ∧  b^{2, 525}_1 ∧  b^{2, 525}_0 ∧ true) 
c  in CNF:
c    -b^{2, 525}_2 ∨ -b^{2, 525}_1 ∨ -b^{2, 525}_0 ∨ false 
c  in DIMACS:
-6221 -6222 -6223  0

c i = 526
c  -2+1 --> -1
c    ( b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧  p_1052) -> ( b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0)
c  in CNF:
c    -b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨  b^{2, 527}_2
c    -b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_1
c    -b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨  b^{2, 527}_0
c  in DIMACS:
-6224 -6225  6226 -1052  6227 0
-6224 -6225  6226 -1052 -6228 0
-6224 -6225  6226 -1052  6229 0

c  -1+1 --> 0
c    ( b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0 ∧  p_1052) -> (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧ -b^{2, 527}_0)
c  in CNF:
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_2
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_1
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_0
c  in DIMACS:
-6224  6225 -6226 -1052 -6227 0
-6224  6225 -6226 -1052 -6228 0
-6224  6225 -6226 -1052 -6229 0

c  0+1 --> 1
c    (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧  p_1052) -> (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0)
c  in CNF:
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_2
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_1
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨  b^{2, 527}_0
c  in DIMACS:
 6224  6225  6226 -1052 -6227 0
 6224  6225  6226 -1052 -6228 0
 6224  6225  6226 -1052  6229 0

c  1+1 --> 2
c    (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0 ∧  p_1052) -> (-b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0)
c  in CNF:
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_2
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨  b^{2, 527}_1
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ -p_1052 ∨ -b^{2, 527}_0
c  in DIMACS:
 6224  6225 -6226 -1052 -6227 0
 6224  6225 -6226 -1052  6228 0
 6224  6225 -6226 -1052 -6229 0

c  2+1 --> break 
c    (-b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧  p_1052) -> break
c  in CNF:
c     b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ -p_1052 ∨ break
c  in DIMACS:
 6224 -6225  6226 -1052 1162 0


c  2-1 --> 1
c    (-b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧ -p_1052) -> (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0)
c  in CNF:
c     b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_2
c     b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_1
c     b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨  b^{2, 527}_0
c  in DIMACS:
 6224 -6225  6226  1052 -6227 0
 6224 -6225  6226  1052 -6228 0
 6224 -6225  6226  1052  6229 0

c  1-1 --> 0
c    (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0 ∧ -p_1052) -> (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧ -b^{2, 527}_0)
c  in CNF:
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_2
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_1
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_0
c  in DIMACS:
 6224  6225 -6226  1052 -6227 0
 6224  6225 -6226  1052 -6228 0
 6224  6225 -6226  1052 -6229 0

c  0-1 --> -1
c    (-b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧ -p_1052) -> ( b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0)
c  in CNF:
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨  b^{2, 527}_2
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_1
c     b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨  b^{2, 527}_0
c  in DIMACS:
 6224  6225  6226  1052  6227 0
 6224  6225  6226  1052 -6228 0
 6224  6225  6226  1052  6229 0

c  -1-1 --> -2
c    ( b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧  b^{2, 526}_0 ∧ -p_1052) -> ( b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0)
c  in CNF:
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨  b^{2, 527}_2
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨  b^{2, 527}_1
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨  p_1052 ∨ -b^{2, 527}_0
c  in DIMACS:
-6224  6225 -6226  1052  6227 0
-6224  6225 -6226  1052  6228 0
-6224  6225 -6226  1052 -6229 0

c  -2-1 --> break 
c    ( b^{2, 526}_2 ∧  b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧ -p_1052) -> break
c  in CNF:
c    -b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨  b^{2, 526}_0 ∨  p_1052 ∨ break
c  in DIMACS:
-6224 -6225  6226  1052 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 526}_2 ∧ -b^{2, 526}_1 ∧ -b^{2, 526}_0 ∧ true) 
c  in CNF:
c    -b^{2, 526}_2 ∨  b^{2, 526}_1 ∨  b^{2, 526}_0 ∨ false 
c  in DIMACS:
-6224  6225  6226  0

c  3 does not represent an automaton state.
c    -(-b^{2, 526}_2 ∧  b^{2, 526}_1 ∧  b^{2, 526}_0 ∧ true) 
c  in CNF:
c     b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ false 
c  in DIMACS:
 6224 -6225 -6226  0
c  -3 does not represent an automaton state.
c    -( b^{2, 526}_2 ∧  b^{2, 526}_1 ∧  b^{2, 526}_0 ∧ true) 
c  in CNF:
c    -b^{2, 526}_2 ∨ -b^{2, 526}_1 ∨ -b^{2, 526}_0 ∨ false 
c  in DIMACS:
-6224 -6225 -6226  0

c i = 527
c  -2+1 --> -1
c    ( b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧  p_1054) -> ( b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0)
c  in CNF:
c    -b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨  b^{2, 528}_2
c    -b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_1
c    -b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨  b^{2, 528}_0
c  in DIMACS:
-6227 -6228  6229 -1054  6230 0
-6227 -6228  6229 -1054 -6231 0
-6227 -6228  6229 -1054  6232 0

c  -1+1 --> 0
c    ( b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0 ∧  p_1054) -> (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧ -b^{2, 528}_0)
c  in CNF:
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_2
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_1
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_0
c  in DIMACS:
-6227  6228 -6229 -1054 -6230 0
-6227  6228 -6229 -1054 -6231 0
-6227  6228 -6229 -1054 -6232 0

c  0+1 --> 1
c    (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧  p_1054) -> (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0)
c  in CNF:
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_2
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_1
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨  b^{2, 528}_0
c  in DIMACS:
 6227  6228  6229 -1054 -6230 0
 6227  6228  6229 -1054 -6231 0
 6227  6228  6229 -1054  6232 0

c  1+1 --> 2
c    (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0 ∧  p_1054) -> (-b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0)
c  in CNF:
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_2
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨  b^{2, 528}_1
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ -p_1054 ∨ -b^{2, 528}_0
c  in DIMACS:
 6227  6228 -6229 -1054 -6230 0
 6227  6228 -6229 -1054  6231 0
 6227  6228 -6229 -1054 -6232 0

c  2+1 --> break 
c    (-b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 6227 -6228  6229 -1054 1162 0


c  2-1 --> 1
c    (-b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧ -p_1054) -> (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0)
c  in CNF:
c     b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_2
c     b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_1
c     b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨  b^{2, 528}_0
c  in DIMACS:
 6227 -6228  6229  1054 -6230 0
 6227 -6228  6229  1054 -6231 0
 6227 -6228  6229  1054  6232 0

c  1-1 --> 0
c    (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0 ∧ -p_1054) -> (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧ -b^{2, 528}_0)
c  in CNF:
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_2
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_1
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_0
c  in DIMACS:
 6227  6228 -6229  1054 -6230 0
 6227  6228 -6229  1054 -6231 0
 6227  6228 -6229  1054 -6232 0

c  0-1 --> -1
c    (-b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧ -p_1054) -> ( b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0)
c  in CNF:
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨  b^{2, 528}_2
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_1
c     b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨  b^{2, 528}_0
c  in DIMACS:
 6227  6228  6229  1054  6230 0
 6227  6228  6229  1054 -6231 0
 6227  6228  6229  1054  6232 0

c  -1-1 --> -2
c    ( b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧  b^{2, 527}_0 ∧ -p_1054) -> ( b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0)
c  in CNF:
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨  b^{2, 528}_2
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨  b^{2, 528}_1
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨  p_1054 ∨ -b^{2, 528}_0
c  in DIMACS:
-6227  6228 -6229  1054  6230 0
-6227  6228 -6229  1054  6231 0
-6227  6228 -6229  1054 -6232 0

c  -2-1 --> break 
c    ( b^{2, 527}_2 ∧  b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨  b^{2, 527}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-6227 -6228  6229  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 527}_2 ∧ -b^{2, 527}_1 ∧ -b^{2, 527}_0 ∧ true) 
c  in CNF:
c    -b^{2, 527}_2 ∨  b^{2, 527}_1 ∨  b^{2, 527}_0 ∨ false 
c  in DIMACS:
-6227  6228  6229  0

c  3 does not represent an automaton state.
c    -(-b^{2, 527}_2 ∧  b^{2, 527}_1 ∧  b^{2, 527}_0 ∧ true) 
c  in CNF:
c     b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ false 
c  in DIMACS:
 6227 -6228 -6229  0
c  -3 does not represent an automaton state.
c    -( b^{2, 527}_2 ∧  b^{2, 527}_1 ∧  b^{2, 527}_0 ∧ true) 
c  in CNF:
c    -b^{2, 527}_2 ∨ -b^{2, 527}_1 ∨ -b^{2, 527}_0 ∨ false 
c  in DIMACS:
-6227 -6228 -6229  0

c i = 528
c  -2+1 --> -1
c    ( b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧  p_1056) -> ( b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0)
c  in CNF:
c    -b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨  b^{2, 529}_2
c    -b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_1
c    -b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨  b^{2, 529}_0
c  in DIMACS:
-6230 -6231  6232 -1056  6233 0
-6230 -6231  6232 -1056 -6234 0
-6230 -6231  6232 -1056  6235 0

c  -1+1 --> 0
c    ( b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0 ∧  p_1056) -> (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧ -b^{2, 529}_0)
c  in CNF:
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_2
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_1
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_0
c  in DIMACS:
-6230  6231 -6232 -1056 -6233 0
-6230  6231 -6232 -1056 -6234 0
-6230  6231 -6232 -1056 -6235 0

c  0+1 --> 1
c    (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧  p_1056) -> (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0)
c  in CNF:
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_2
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_1
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨  b^{2, 529}_0
c  in DIMACS:
 6230  6231  6232 -1056 -6233 0
 6230  6231  6232 -1056 -6234 0
 6230  6231  6232 -1056  6235 0

c  1+1 --> 2
c    (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0 ∧  p_1056) -> (-b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0)
c  in CNF:
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_2
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨  b^{2, 529}_1
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ -p_1056 ∨ -b^{2, 529}_0
c  in DIMACS:
 6230  6231 -6232 -1056 -6233 0
 6230  6231 -6232 -1056  6234 0
 6230  6231 -6232 -1056 -6235 0

c  2+1 --> break 
c    (-b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 6230 -6231  6232 -1056 1162 0


c  2-1 --> 1
c    (-b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧ -p_1056) -> (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0)
c  in CNF:
c     b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_2
c     b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_1
c     b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨  b^{2, 529}_0
c  in DIMACS:
 6230 -6231  6232  1056 -6233 0
 6230 -6231  6232  1056 -6234 0
 6230 -6231  6232  1056  6235 0

c  1-1 --> 0
c    (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0 ∧ -p_1056) -> (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧ -b^{2, 529}_0)
c  in CNF:
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_2
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_1
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_0
c  in DIMACS:
 6230  6231 -6232  1056 -6233 0
 6230  6231 -6232  1056 -6234 0
 6230  6231 -6232  1056 -6235 0

c  0-1 --> -1
c    (-b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧ -p_1056) -> ( b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0)
c  in CNF:
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨  b^{2, 529}_2
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_1
c     b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨  b^{2, 529}_0
c  in DIMACS:
 6230  6231  6232  1056  6233 0
 6230  6231  6232  1056 -6234 0
 6230  6231  6232  1056  6235 0

c  -1-1 --> -2
c    ( b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧  b^{2, 528}_0 ∧ -p_1056) -> ( b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0)
c  in CNF:
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨  b^{2, 529}_2
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨  b^{2, 529}_1
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨  p_1056 ∨ -b^{2, 529}_0
c  in DIMACS:
-6230  6231 -6232  1056  6233 0
-6230  6231 -6232  1056  6234 0
-6230  6231 -6232  1056 -6235 0

c  -2-1 --> break 
c    ( b^{2, 528}_2 ∧  b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨  b^{2, 528}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-6230 -6231  6232  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 528}_2 ∧ -b^{2, 528}_1 ∧ -b^{2, 528}_0 ∧ true) 
c  in CNF:
c    -b^{2, 528}_2 ∨  b^{2, 528}_1 ∨  b^{2, 528}_0 ∨ false 
c  in DIMACS:
-6230  6231  6232  0

c  3 does not represent an automaton state.
c    -(-b^{2, 528}_2 ∧  b^{2, 528}_1 ∧  b^{2, 528}_0 ∧ true) 
c  in CNF:
c     b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ false 
c  in DIMACS:
 6230 -6231 -6232  0
c  -3 does not represent an automaton state.
c    -( b^{2, 528}_2 ∧  b^{2, 528}_1 ∧  b^{2, 528}_0 ∧ true) 
c  in CNF:
c    -b^{2, 528}_2 ∨ -b^{2, 528}_1 ∨ -b^{2, 528}_0 ∨ false 
c  in DIMACS:
-6230 -6231 -6232  0

c i = 529
c  -2+1 --> -1
c    ( b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧  p_1058) -> ( b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0)
c  in CNF:
c    -b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨  b^{2, 530}_2
c    -b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_1
c    -b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨  b^{2, 530}_0
c  in DIMACS:
-6233 -6234  6235 -1058  6236 0
-6233 -6234  6235 -1058 -6237 0
-6233 -6234  6235 -1058  6238 0

c  -1+1 --> 0
c    ( b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0 ∧  p_1058) -> (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧ -b^{2, 530}_0)
c  in CNF:
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_2
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_1
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_0
c  in DIMACS:
-6233  6234 -6235 -1058 -6236 0
-6233  6234 -6235 -1058 -6237 0
-6233  6234 -6235 -1058 -6238 0

c  0+1 --> 1
c    (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧  p_1058) -> (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0)
c  in CNF:
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_2
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_1
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨  b^{2, 530}_0
c  in DIMACS:
 6233  6234  6235 -1058 -6236 0
 6233  6234  6235 -1058 -6237 0
 6233  6234  6235 -1058  6238 0

c  1+1 --> 2
c    (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0 ∧  p_1058) -> (-b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0)
c  in CNF:
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_2
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨  b^{2, 530}_1
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ -p_1058 ∨ -b^{2, 530}_0
c  in DIMACS:
 6233  6234 -6235 -1058 -6236 0
 6233  6234 -6235 -1058  6237 0
 6233  6234 -6235 -1058 -6238 0

c  2+1 --> break 
c    (-b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧  p_1058) -> break
c  in CNF:
c     b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ -p_1058 ∨ break
c  in DIMACS:
 6233 -6234  6235 -1058 1162 0


c  2-1 --> 1
c    (-b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧ -p_1058) -> (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0)
c  in CNF:
c     b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_2
c     b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_1
c     b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨  b^{2, 530}_0
c  in DIMACS:
 6233 -6234  6235  1058 -6236 0
 6233 -6234  6235  1058 -6237 0
 6233 -6234  6235  1058  6238 0

c  1-1 --> 0
c    (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0 ∧ -p_1058) -> (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧ -b^{2, 530}_0)
c  in CNF:
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_2
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_1
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_0
c  in DIMACS:
 6233  6234 -6235  1058 -6236 0
 6233  6234 -6235  1058 -6237 0
 6233  6234 -6235  1058 -6238 0

c  0-1 --> -1
c    (-b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧ -p_1058) -> ( b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0)
c  in CNF:
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨  b^{2, 530}_2
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_1
c     b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨  b^{2, 530}_0
c  in DIMACS:
 6233  6234  6235  1058  6236 0
 6233  6234  6235  1058 -6237 0
 6233  6234  6235  1058  6238 0

c  -1-1 --> -2
c    ( b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧  b^{2, 529}_0 ∧ -p_1058) -> ( b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0)
c  in CNF:
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨  b^{2, 530}_2
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨  b^{2, 530}_1
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨  p_1058 ∨ -b^{2, 530}_0
c  in DIMACS:
-6233  6234 -6235  1058  6236 0
-6233  6234 -6235  1058  6237 0
-6233  6234 -6235  1058 -6238 0

c  -2-1 --> break 
c    ( b^{2, 529}_2 ∧  b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧ -p_1058) -> break
c  in CNF:
c    -b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨  b^{2, 529}_0 ∨  p_1058 ∨ break
c  in DIMACS:
-6233 -6234  6235  1058 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 529}_2 ∧ -b^{2, 529}_1 ∧ -b^{2, 529}_0 ∧ true) 
c  in CNF:
c    -b^{2, 529}_2 ∨  b^{2, 529}_1 ∨  b^{2, 529}_0 ∨ false 
c  in DIMACS:
-6233  6234  6235  0

c  3 does not represent an automaton state.
c    -(-b^{2, 529}_2 ∧  b^{2, 529}_1 ∧  b^{2, 529}_0 ∧ true) 
c  in CNF:
c     b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ false 
c  in DIMACS:
 6233 -6234 -6235  0
c  -3 does not represent an automaton state.
c    -( b^{2, 529}_2 ∧  b^{2, 529}_1 ∧  b^{2, 529}_0 ∧ true) 
c  in CNF:
c    -b^{2, 529}_2 ∨ -b^{2, 529}_1 ∨ -b^{2, 529}_0 ∨ false 
c  in DIMACS:
-6233 -6234 -6235  0

c i = 530
c  -2+1 --> -1
c    ( b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧  p_1060) -> ( b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0)
c  in CNF:
c    -b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨  b^{2, 531}_2
c    -b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_1
c    -b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨  b^{2, 531}_0
c  in DIMACS:
-6236 -6237  6238 -1060  6239 0
-6236 -6237  6238 -1060 -6240 0
-6236 -6237  6238 -1060  6241 0

c  -1+1 --> 0
c    ( b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0 ∧  p_1060) -> (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧ -b^{2, 531}_0)
c  in CNF:
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_2
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_1
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_0
c  in DIMACS:
-6236  6237 -6238 -1060 -6239 0
-6236  6237 -6238 -1060 -6240 0
-6236  6237 -6238 -1060 -6241 0

c  0+1 --> 1
c    (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧  p_1060) -> (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0)
c  in CNF:
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_2
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_1
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨  b^{2, 531}_0
c  in DIMACS:
 6236  6237  6238 -1060 -6239 0
 6236  6237  6238 -1060 -6240 0
 6236  6237  6238 -1060  6241 0

c  1+1 --> 2
c    (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0 ∧  p_1060) -> (-b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0)
c  in CNF:
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_2
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨  b^{2, 531}_1
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ -p_1060 ∨ -b^{2, 531}_0
c  in DIMACS:
 6236  6237 -6238 -1060 -6239 0
 6236  6237 -6238 -1060  6240 0
 6236  6237 -6238 -1060 -6241 0

c  2+1 --> break 
c    (-b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 6236 -6237  6238 -1060 1162 0


c  2-1 --> 1
c    (-b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧ -p_1060) -> (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0)
c  in CNF:
c     b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_2
c     b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_1
c     b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨  b^{2, 531}_0
c  in DIMACS:
 6236 -6237  6238  1060 -6239 0
 6236 -6237  6238  1060 -6240 0
 6236 -6237  6238  1060  6241 0

c  1-1 --> 0
c    (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0 ∧ -p_1060) -> (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧ -b^{2, 531}_0)
c  in CNF:
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_2
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_1
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_0
c  in DIMACS:
 6236  6237 -6238  1060 -6239 0
 6236  6237 -6238  1060 -6240 0
 6236  6237 -6238  1060 -6241 0

c  0-1 --> -1
c    (-b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧ -p_1060) -> ( b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0)
c  in CNF:
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨  b^{2, 531}_2
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_1
c     b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨  b^{2, 531}_0
c  in DIMACS:
 6236  6237  6238  1060  6239 0
 6236  6237  6238  1060 -6240 0
 6236  6237  6238  1060  6241 0

c  -1-1 --> -2
c    ( b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧  b^{2, 530}_0 ∧ -p_1060) -> ( b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0)
c  in CNF:
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨  b^{2, 531}_2
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨  b^{2, 531}_1
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨  p_1060 ∨ -b^{2, 531}_0
c  in DIMACS:
-6236  6237 -6238  1060  6239 0
-6236  6237 -6238  1060  6240 0
-6236  6237 -6238  1060 -6241 0

c  -2-1 --> break 
c    ( b^{2, 530}_2 ∧  b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨  b^{2, 530}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-6236 -6237  6238  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 530}_2 ∧ -b^{2, 530}_1 ∧ -b^{2, 530}_0 ∧ true) 
c  in CNF:
c    -b^{2, 530}_2 ∨  b^{2, 530}_1 ∨  b^{2, 530}_0 ∨ false 
c  in DIMACS:
-6236  6237  6238  0

c  3 does not represent an automaton state.
c    -(-b^{2, 530}_2 ∧  b^{2, 530}_1 ∧  b^{2, 530}_0 ∧ true) 
c  in CNF:
c     b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ false 
c  in DIMACS:
 6236 -6237 -6238  0
c  -3 does not represent an automaton state.
c    -( b^{2, 530}_2 ∧  b^{2, 530}_1 ∧  b^{2, 530}_0 ∧ true) 
c  in CNF:
c    -b^{2, 530}_2 ∨ -b^{2, 530}_1 ∨ -b^{2, 530}_0 ∨ false 
c  in DIMACS:
-6236 -6237 -6238  0

c i = 531
c  -2+1 --> -1
c    ( b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧  p_1062) -> ( b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0)
c  in CNF:
c    -b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨  b^{2, 532}_2
c    -b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_1
c    -b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨  b^{2, 532}_0
c  in DIMACS:
-6239 -6240  6241 -1062  6242 0
-6239 -6240  6241 -1062 -6243 0
-6239 -6240  6241 -1062  6244 0

c  -1+1 --> 0
c    ( b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0 ∧  p_1062) -> (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧ -b^{2, 532}_0)
c  in CNF:
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_2
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_1
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_0
c  in DIMACS:
-6239  6240 -6241 -1062 -6242 0
-6239  6240 -6241 -1062 -6243 0
-6239  6240 -6241 -1062 -6244 0

c  0+1 --> 1
c    (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧  p_1062) -> (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0)
c  in CNF:
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_2
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_1
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨  b^{2, 532}_0
c  in DIMACS:
 6239  6240  6241 -1062 -6242 0
 6239  6240  6241 -1062 -6243 0
 6239  6240  6241 -1062  6244 0

c  1+1 --> 2
c    (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0 ∧  p_1062) -> (-b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0)
c  in CNF:
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_2
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨  b^{2, 532}_1
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ -p_1062 ∨ -b^{2, 532}_0
c  in DIMACS:
 6239  6240 -6241 -1062 -6242 0
 6239  6240 -6241 -1062  6243 0
 6239  6240 -6241 -1062 -6244 0

c  2+1 --> break 
c    (-b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 6239 -6240  6241 -1062 1162 0


c  2-1 --> 1
c    (-b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧ -p_1062) -> (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0)
c  in CNF:
c     b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_2
c     b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_1
c     b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨  b^{2, 532}_0
c  in DIMACS:
 6239 -6240  6241  1062 -6242 0
 6239 -6240  6241  1062 -6243 0
 6239 -6240  6241  1062  6244 0

c  1-1 --> 0
c    (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0 ∧ -p_1062) -> (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧ -b^{2, 532}_0)
c  in CNF:
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_2
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_1
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_0
c  in DIMACS:
 6239  6240 -6241  1062 -6242 0
 6239  6240 -6241  1062 -6243 0
 6239  6240 -6241  1062 -6244 0

c  0-1 --> -1
c    (-b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧ -p_1062) -> ( b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0)
c  in CNF:
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨  b^{2, 532}_2
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_1
c     b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨  b^{2, 532}_0
c  in DIMACS:
 6239  6240  6241  1062  6242 0
 6239  6240  6241  1062 -6243 0
 6239  6240  6241  1062  6244 0

c  -1-1 --> -2
c    ( b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧  b^{2, 531}_0 ∧ -p_1062) -> ( b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0)
c  in CNF:
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨  b^{2, 532}_2
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨  b^{2, 532}_1
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨  p_1062 ∨ -b^{2, 532}_0
c  in DIMACS:
-6239  6240 -6241  1062  6242 0
-6239  6240 -6241  1062  6243 0
-6239  6240 -6241  1062 -6244 0

c  -2-1 --> break 
c    ( b^{2, 531}_2 ∧  b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨  b^{2, 531}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-6239 -6240  6241  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 531}_2 ∧ -b^{2, 531}_1 ∧ -b^{2, 531}_0 ∧ true) 
c  in CNF:
c    -b^{2, 531}_2 ∨  b^{2, 531}_1 ∨  b^{2, 531}_0 ∨ false 
c  in DIMACS:
-6239  6240  6241  0

c  3 does not represent an automaton state.
c    -(-b^{2, 531}_2 ∧  b^{2, 531}_1 ∧  b^{2, 531}_0 ∧ true) 
c  in CNF:
c     b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ false 
c  in DIMACS:
 6239 -6240 -6241  0
c  -3 does not represent an automaton state.
c    -( b^{2, 531}_2 ∧  b^{2, 531}_1 ∧  b^{2, 531}_0 ∧ true) 
c  in CNF:
c    -b^{2, 531}_2 ∨ -b^{2, 531}_1 ∨ -b^{2, 531}_0 ∨ false 
c  in DIMACS:
-6239 -6240 -6241  0

c i = 532
c  -2+1 --> -1
c    ( b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧  p_1064) -> ( b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0)
c  in CNF:
c    -b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨  b^{2, 533}_2
c    -b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_1
c    -b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨  b^{2, 533}_0
c  in DIMACS:
-6242 -6243  6244 -1064  6245 0
-6242 -6243  6244 -1064 -6246 0
-6242 -6243  6244 -1064  6247 0

c  -1+1 --> 0
c    ( b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0 ∧  p_1064) -> (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧ -b^{2, 533}_0)
c  in CNF:
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_2
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_1
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_0
c  in DIMACS:
-6242  6243 -6244 -1064 -6245 0
-6242  6243 -6244 -1064 -6246 0
-6242  6243 -6244 -1064 -6247 0

c  0+1 --> 1
c    (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧  p_1064) -> (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0)
c  in CNF:
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_2
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_1
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨  b^{2, 533}_0
c  in DIMACS:
 6242  6243  6244 -1064 -6245 0
 6242  6243  6244 -1064 -6246 0
 6242  6243  6244 -1064  6247 0

c  1+1 --> 2
c    (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0 ∧  p_1064) -> (-b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0)
c  in CNF:
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_2
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨  b^{2, 533}_1
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ -p_1064 ∨ -b^{2, 533}_0
c  in DIMACS:
 6242  6243 -6244 -1064 -6245 0
 6242  6243 -6244 -1064  6246 0
 6242  6243 -6244 -1064 -6247 0

c  2+1 --> break 
c    (-b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 6242 -6243  6244 -1064 1162 0


c  2-1 --> 1
c    (-b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧ -p_1064) -> (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0)
c  in CNF:
c     b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_2
c     b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_1
c     b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨  b^{2, 533}_0
c  in DIMACS:
 6242 -6243  6244  1064 -6245 0
 6242 -6243  6244  1064 -6246 0
 6242 -6243  6244  1064  6247 0

c  1-1 --> 0
c    (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0 ∧ -p_1064) -> (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧ -b^{2, 533}_0)
c  in CNF:
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_2
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_1
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_0
c  in DIMACS:
 6242  6243 -6244  1064 -6245 0
 6242  6243 -6244  1064 -6246 0
 6242  6243 -6244  1064 -6247 0

c  0-1 --> -1
c    (-b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧ -p_1064) -> ( b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0)
c  in CNF:
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨  b^{2, 533}_2
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_1
c     b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨  b^{2, 533}_0
c  in DIMACS:
 6242  6243  6244  1064  6245 0
 6242  6243  6244  1064 -6246 0
 6242  6243  6244  1064  6247 0

c  -1-1 --> -2
c    ( b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧  b^{2, 532}_0 ∧ -p_1064) -> ( b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0)
c  in CNF:
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨  b^{2, 533}_2
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨  b^{2, 533}_1
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨  p_1064 ∨ -b^{2, 533}_0
c  in DIMACS:
-6242  6243 -6244  1064  6245 0
-6242  6243 -6244  1064  6246 0
-6242  6243 -6244  1064 -6247 0

c  -2-1 --> break 
c    ( b^{2, 532}_2 ∧  b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨  b^{2, 532}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-6242 -6243  6244  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 532}_2 ∧ -b^{2, 532}_1 ∧ -b^{2, 532}_0 ∧ true) 
c  in CNF:
c    -b^{2, 532}_2 ∨  b^{2, 532}_1 ∨  b^{2, 532}_0 ∨ false 
c  in DIMACS:
-6242  6243  6244  0

c  3 does not represent an automaton state.
c    -(-b^{2, 532}_2 ∧  b^{2, 532}_1 ∧  b^{2, 532}_0 ∧ true) 
c  in CNF:
c     b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ false 
c  in DIMACS:
 6242 -6243 -6244  0
c  -3 does not represent an automaton state.
c    -( b^{2, 532}_2 ∧  b^{2, 532}_1 ∧  b^{2, 532}_0 ∧ true) 
c  in CNF:
c    -b^{2, 532}_2 ∨ -b^{2, 532}_1 ∨ -b^{2, 532}_0 ∨ false 
c  in DIMACS:
-6242 -6243 -6244  0

c i = 533
c  -2+1 --> -1
c    ( b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧  p_1066) -> ( b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0)
c  in CNF:
c    -b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨  b^{2, 534}_2
c    -b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_1
c    -b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨  b^{2, 534}_0
c  in DIMACS:
-6245 -6246  6247 -1066  6248 0
-6245 -6246  6247 -1066 -6249 0
-6245 -6246  6247 -1066  6250 0

c  -1+1 --> 0
c    ( b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0 ∧  p_1066) -> (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧ -b^{2, 534}_0)
c  in CNF:
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_2
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_1
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_0
c  in DIMACS:
-6245  6246 -6247 -1066 -6248 0
-6245  6246 -6247 -1066 -6249 0
-6245  6246 -6247 -1066 -6250 0

c  0+1 --> 1
c    (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧  p_1066) -> (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0)
c  in CNF:
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_2
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_1
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨  b^{2, 534}_0
c  in DIMACS:
 6245  6246  6247 -1066 -6248 0
 6245  6246  6247 -1066 -6249 0
 6245  6246  6247 -1066  6250 0

c  1+1 --> 2
c    (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0 ∧  p_1066) -> (-b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0)
c  in CNF:
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_2
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨  b^{2, 534}_1
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ -p_1066 ∨ -b^{2, 534}_0
c  in DIMACS:
 6245  6246 -6247 -1066 -6248 0
 6245  6246 -6247 -1066  6249 0
 6245  6246 -6247 -1066 -6250 0

c  2+1 --> break 
c    (-b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 6245 -6246  6247 -1066 1162 0


c  2-1 --> 1
c    (-b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧ -p_1066) -> (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0)
c  in CNF:
c     b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_2
c     b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_1
c     b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨  b^{2, 534}_0
c  in DIMACS:
 6245 -6246  6247  1066 -6248 0
 6245 -6246  6247  1066 -6249 0
 6245 -6246  6247  1066  6250 0

c  1-1 --> 0
c    (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0 ∧ -p_1066) -> (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧ -b^{2, 534}_0)
c  in CNF:
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_2
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_1
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_0
c  in DIMACS:
 6245  6246 -6247  1066 -6248 0
 6245  6246 -6247  1066 -6249 0
 6245  6246 -6247  1066 -6250 0

c  0-1 --> -1
c    (-b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧ -p_1066) -> ( b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0)
c  in CNF:
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨  b^{2, 534}_2
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_1
c     b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨  b^{2, 534}_0
c  in DIMACS:
 6245  6246  6247  1066  6248 0
 6245  6246  6247  1066 -6249 0
 6245  6246  6247  1066  6250 0

c  -1-1 --> -2
c    ( b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧  b^{2, 533}_0 ∧ -p_1066) -> ( b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0)
c  in CNF:
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨  b^{2, 534}_2
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨  b^{2, 534}_1
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨  p_1066 ∨ -b^{2, 534}_0
c  in DIMACS:
-6245  6246 -6247  1066  6248 0
-6245  6246 -6247  1066  6249 0
-6245  6246 -6247  1066 -6250 0

c  -2-1 --> break 
c    ( b^{2, 533}_2 ∧  b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨  b^{2, 533}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-6245 -6246  6247  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 533}_2 ∧ -b^{2, 533}_1 ∧ -b^{2, 533}_0 ∧ true) 
c  in CNF:
c    -b^{2, 533}_2 ∨  b^{2, 533}_1 ∨  b^{2, 533}_0 ∨ false 
c  in DIMACS:
-6245  6246  6247  0

c  3 does not represent an automaton state.
c    -(-b^{2, 533}_2 ∧  b^{2, 533}_1 ∧  b^{2, 533}_0 ∧ true) 
c  in CNF:
c     b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ false 
c  in DIMACS:
 6245 -6246 -6247  0
c  -3 does not represent an automaton state.
c    -( b^{2, 533}_2 ∧  b^{2, 533}_1 ∧  b^{2, 533}_0 ∧ true) 
c  in CNF:
c    -b^{2, 533}_2 ∨ -b^{2, 533}_1 ∨ -b^{2, 533}_0 ∨ false 
c  in DIMACS:
-6245 -6246 -6247  0

c i = 534
c  -2+1 --> -1
c    ( b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧  p_1068) -> ( b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0)
c  in CNF:
c    -b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨  b^{2, 535}_2
c    -b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_1
c    -b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨  b^{2, 535}_0
c  in DIMACS:
-6248 -6249  6250 -1068  6251 0
-6248 -6249  6250 -1068 -6252 0
-6248 -6249  6250 -1068  6253 0

c  -1+1 --> 0
c    ( b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0 ∧  p_1068) -> (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧ -b^{2, 535}_0)
c  in CNF:
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_2
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_1
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_0
c  in DIMACS:
-6248  6249 -6250 -1068 -6251 0
-6248  6249 -6250 -1068 -6252 0
-6248  6249 -6250 -1068 -6253 0

c  0+1 --> 1
c    (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧  p_1068) -> (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0)
c  in CNF:
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_2
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_1
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨  b^{2, 535}_0
c  in DIMACS:
 6248  6249  6250 -1068 -6251 0
 6248  6249  6250 -1068 -6252 0
 6248  6249  6250 -1068  6253 0

c  1+1 --> 2
c    (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0 ∧  p_1068) -> (-b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0)
c  in CNF:
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_2
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨  b^{2, 535}_1
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ -p_1068 ∨ -b^{2, 535}_0
c  in DIMACS:
 6248  6249 -6250 -1068 -6251 0
 6248  6249 -6250 -1068  6252 0
 6248  6249 -6250 -1068 -6253 0

c  2+1 --> break 
c    (-b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 6248 -6249  6250 -1068 1162 0


c  2-1 --> 1
c    (-b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧ -p_1068) -> (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0)
c  in CNF:
c     b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_2
c     b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_1
c     b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨  b^{2, 535}_0
c  in DIMACS:
 6248 -6249  6250  1068 -6251 0
 6248 -6249  6250  1068 -6252 0
 6248 -6249  6250  1068  6253 0

c  1-1 --> 0
c    (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0 ∧ -p_1068) -> (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧ -b^{2, 535}_0)
c  in CNF:
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_2
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_1
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_0
c  in DIMACS:
 6248  6249 -6250  1068 -6251 0
 6248  6249 -6250  1068 -6252 0
 6248  6249 -6250  1068 -6253 0

c  0-1 --> -1
c    (-b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧ -p_1068) -> ( b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0)
c  in CNF:
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨  b^{2, 535}_2
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_1
c     b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨  b^{2, 535}_0
c  in DIMACS:
 6248  6249  6250  1068  6251 0
 6248  6249  6250  1068 -6252 0
 6248  6249  6250  1068  6253 0

c  -1-1 --> -2
c    ( b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧  b^{2, 534}_0 ∧ -p_1068) -> ( b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0)
c  in CNF:
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨  b^{2, 535}_2
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨  b^{2, 535}_1
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨  p_1068 ∨ -b^{2, 535}_0
c  in DIMACS:
-6248  6249 -6250  1068  6251 0
-6248  6249 -6250  1068  6252 0
-6248  6249 -6250  1068 -6253 0

c  -2-1 --> break 
c    ( b^{2, 534}_2 ∧  b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨  b^{2, 534}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-6248 -6249  6250  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 534}_2 ∧ -b^{2, 534}_1 ∧ -b^{2, 534}_0 ∧ true) 
c  in CNF:
c    -b^{2, 534}_2 ∨  b^{2, 534}_1 ∨  b^{2, 534}_0 ∨ false 
c  in DIMACS:
-6248  6249  6250  0

c  3 does not represent an automaton state.
c    -(-b^{2, 534}_2 ∧  b^{2, 534}_1 ∧  b^{2, 534}_0 ∧ true) 
c  in CNF:
c     b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ false 
c  in DIMACS:
 6248 -6249 -6250  0
c  -3 does not represent an automaton state.
c    -( b^{2, 534}_2 ∧  b^{2, 534}_1 ∧  b^{2, 534}_0 ∧ true) 
c  in CNF:
c    -b^{2, 534}_2 ∨ -b^{2, 534}_1 ∨ -b^{2, 534}_0 ∨ false 
c  in DIMACS:
-6248 -6249 -6250  0

c i = 535
c  -2+1 --> -1
c    ( b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧  p_1070) -> ( b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0)
c  in CNF:
c    -b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨  b^{2, 536}_2
c    -b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_1
c    -b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨  b^{2, 536}_0
c  in DIMACS:
-6251 -6252  6253 -1070  6254 0
-6251 -6252  6253 -1070 -6255 0
-6251 -6252  6253 -1070  6256 0

c  -1+1 --> 0
c    ( b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0 ∧  p_1070) -> (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧ -b^{2, 536}_0)
c  in CNF:
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_2
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_1
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_0
c  in DIMACS:
-6251  6252 -6253 -1070 -6254 0
-6251  6252 -6253 -1070 -6255 0
-6251  6252 -6253 -1070 -6256 0

c  0+1 --> 1
c    (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧  p_1070) -> (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0)
c  in CNF:
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_2
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_1
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨  b^{2, 536}_0
c  in DIMACS:
 6251  6252  6253 -1070 -6254 0
 6251  6252  6253 -1070 -6255 0
 6251  6252  6253 -1070  6256 0

c  1+1 --> 2
c    (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0 ∧  p_1070) -> (-b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0)
c  in CNF:
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_2
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨  b^{2, 536}_1
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ -p_1070 ∨ -b^{2, 536}_0
c  in DIMACS:
 6251  6252 -6253 -1070 -6254 0
 6251  6252 -6253 -1070  6255 0
 6251  6252 -6253 -1070 -6256 0

c  2+1 --> break 
c    (-b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 6251 -6252  6253 -1070 1162 0


c  2-1 --> 1
c    (-b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧ -p_1070) -> (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0)
c  in CNF:
c     b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_2
c     b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_1
c     b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨  b^{2, 536}_0
c  in DIMACS:
 6251 -6252  6253  1070 -6254 0
 6251 -6252  6253  1070 -6255 0
 6251 -6252  6253  1070  6256 0

c  1-1 --> 0
c    (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0 ∧ -p_1070) -> (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧ -b^{2, 536}_0)
c  in CNF:
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_2
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_1
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_0
c  in DIMACS:
 6251  6252 -6253  1070 -6254 0
 6251  6252 -6253  1070 -6255 0
 6251  6252 -6253  1070 -6256 0

c  0-1 --> -1
c    (-b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧ -p_1070) -> ( b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0)
c  in CNF:
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨  b^{2, 536}_2
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_1
c     b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨  b^{2, 536}_0
c  in DIMACS:
 6251  6252  6253  1070  6254 0
 6251  6252  6253  1070 -6255 0
 6251  6252  6253  1070  6256 0

c  -1-1 --> -2
c    ( b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧  b^{2, 535}_0 ∧ -p_1070) -> ( b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0)
c  in CNF:
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨  b^{2, 536}_2
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨  b^{2, 536}_1
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨  p_1070 ∨ -b^{2, 536}_0
c  in DIMACS:
-6251  6252 -6253  1070  6254 0
-6251  6252 -6253  1070  6255 0
-6251  6252 -6253  1070 -6256 0

c  -2-1 --> break 
c    ( b^{2, 535}_2 ∧  b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨  b^{2, 535}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-6251 -6252  6253  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 535}_2 ∧ -b^{2, 535}_1 ∧ -b^{2, 535}_0 ∧ true) 
c  in CNF:
c    -b^{2, 535}_2 ∨  b^{2, 535}_1 ∨  b^{2, 535}_0 ∨ false 
c  in DIMACS:
-6251  6252  6253  0

c  3 does not represent an automaton state.
c    -(-b^{2, 535}_2 ∧  b^{2, 535}_1 ∧  b^{2, 535}_0 ∧ true) 
c  in CNF:
c     b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ false 
c  in DIMACS:
 6251 -6252 -6253  0
c  -3 does not represent an automaton state.
c    -( b^{2, 535}_2 ∧  b^{2, 535}_1 ∧  b^{2, 535}_0 ∧ true) 
c  in CNF:
c    -b^{2, 535}_2 ∨ -b^{2, 535}_1 ∨ -b^{2, 535}_0 ∨ false 
c  in DIMACS:
-6251 -6252 -6253  0

c i = 536
c  -2+1 --> -1
c    ( b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧  p_1072) -> ( b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0)
c  in CNF:
c    -b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨  b^{2, 537}_2
c    -b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_1
c    -b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨  b^{2, 537}_0
c  in DIMACS:
-6254 -6255  6256 -1072  6257 0
-6254 -6255  6256 -1072 -6258 0
-6254 -6255  6256 -1072  6259 0

c  -1+1 --> 0
c    ( b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0 ∧  p_1072) -> (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧ -b^{2, 537}_0)
c  in CNF:
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_2
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_1
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_0
c  in DIMACS:
-6254  6255 -6256 -1072 -6257 0
-6254  6255 -6256 -1072 -6258 0
-6254  6255 -6256 -1072 -6259 0

c  0+1 --> 1
c    (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧  p_1072) -> (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0)
c  in CNF:
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_2
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_1
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨  b^{2, 537}_0
c  in DIMACS:
 6254  6255  6256 -1072 -6257 0
 6254  6255  6256 -1072 -6258 0
 6254  6255  6256 -1072  6259 0

c  1+1 --> 2
c    (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0 ∧  p_1072) -> (-b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0)
c  in CNF:
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_2
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨  b^{2, 537}_1
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ -p_1072 ∨ -b^{2, 537}_0
c  in DIMACS:
 6254  6255 -6256 -1072 -6257 0
 6254  6255 -6256 -1072  6258 0
 6254  6255 -6256 -1072 -6259 0

c  2+1 --> break 
c    (-b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 6254 -6255  6256 -1072 1162 0


c  2-1 --> 1
c    (-b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧ -p_1072) -> (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0)
c  in CNF:
c     b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_2
c     b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_1
c     b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨  b^{2, 537}_0
c  in DIMACS:
 6254 -6255  6256  1072 -6257 0
 6254 -6255  6256  1072 -6258 0
 6254 -6255  6256  1072  6259 0

c  1-1 --> 0
c    (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0 ∧ -p_1072) -> (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧ -b^{2, 537}_0)
c  in CNF:
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_2
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_1
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_0
c  in DIMACS:
 6254  6255 -6256  1072 -6257 0
 6254  6255 -6256  1072 -6258 0
 6254  6255 -6256  1072 -6259 0

c  0-1 --> -1
c    (-b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧ -p_1072) -> ( b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0)
c  in CNF:
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨  b^{2, 537}_2
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_1
c     b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨  b^{2, 537}_0
c  in DIMACS:
 6254  6255  6256  1072  6257 0
 6254  6255  6256  1072 -6258 0
 6254  6255  6256  1072  6259 0

c  -1-1 --> -2
c    ( b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧  b^{2, 536}_0 ∧ -p_1072) -> ( b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0)
c  in CNF:
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨  b^{2, 537}_2
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨  b^{2, 537}_1
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨  p_1072 ∨ -b^{2, 537}_0
c  in DIMACS:
-6254  6255 -6256  1072  6257 0
-6254  6255 -6256  1072  6258 0
-6254  6255 -6256  1072 -6259 0

c  -2-1 --> break 
c    ( b^{2, 536}_2 ∧  b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨  b^{2, 536}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-6254 -6255  6256  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 536}_2 ∧ -b^{2, 536}_1 ∧ -b^{2, 536}_0 ∧ true) 
c  in CNF:
c    -b^{2, 536}_2 ∨  b^{2, 536}_1 ∨  b^{2, 536}_0 ∨ false 
c  in DIMACS:
-6254  6255  6256  0

c  3 does not represent an automaton state.
c    -(-b^{2, 536}_2 ∧  b^{2, 536}_1 ∧  b^{2, 536}_0 ∧ true) 
c  in CNF:
c     b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ false 
c  in DIMACS:
 6254 -6255 -6256  0
c  -3 does not represent an automaton state.
c    -( b^{2, 536}_2 ∧  b^{2, 536}_1 ∧  b^{2, 536}_0 ∧ true) 
c  in CNF:
c    -b^{2, 536}_2 ∨ -b^{2, 536}_1 ∨ -b^{2, 536}_0 ∨ false 
c  in DIMACS:
-6254 -6255 -6256  0

c i = 537
c  -2+1 --> -1
c    ( b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧  p_1074) -> ( b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0)
c  in CNF:
c    -b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨  b^{2, 538}_2
c    -b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_1
c    -b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨  b^{2, 538}_0
c  in DIMACS:
-6257 -6258  6259 -1074  6260 0
-6257 -6258  6259 -1074 -6261 0
-6257 -6258  6259 -1074  6262 0

c  -1+1 --> 0
c    ( b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0 ∧  p_1074) -> (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧ -b^{2, 538}_0)
c  in CNF:
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_2
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_1
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_0
c  in DIMACS:
-6257  6258 -6259 -1074 -6260 0
-6257  6258 -6259 -1074 -6261 0
-6257  6258 -6259 -1074 -6262 0

c  0+1 --> 1
c    (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧  p_1074) -> (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0)
c  in CNF:
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_2
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_1
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨  b^{2, 538}_0
c  in DIMACS:
 6257  6258  6259 -1074 -6260 0
 6257  6258  6259 -1074 -6261 0
 6257  6258  6259 -1074  6262 0

c  1+1 --> 2
c    (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0 ∧  p_1074) -> (-b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0)
c  in CNF:
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_2
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨  b^{2, 538}_1
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ -p_1074 ∨ -b^{2, 538}_0
c  in DIMACS:
 6257  6258 -6259 -1074 -6260 0
 6257  6258 -6259 -1074  6261 0
 6257  6258 -6259 -1074 -6262 0

c  2+1 --> break 
c    (-b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 6257 -6258  6259 -1074 1162 0


c  2-1 --> 1
c    (-b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧ -p_1074) -> (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0)
c  in CNF:
c     b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_2
c     b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_1
c     b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨  b^{2, 538}_0
c  in DIMACS:
 6257 -6258  6259  1074 -6260 0
 6257 -6258  6259  1074 -6261 0
 6257 -6258  6259  1074  6262 0

c  1-1 --> 0
c    (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0 ∧ -p_1074) -> (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧ -b^{2, 538}_0)
c  in CNF:
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_2
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_1
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_0
c  in DIMACS:
 6257  6258 -6259  1074 -6260 0
 6257  6258 -6259  1074 -6261 0
 6257  6258 -6259  1074 -6262 0

c  0-1 --> -1
c    (-b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧ -p_1074) -> ( b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0)
c  in CNF:
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨  b^{2, 538}_2
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_1
c     b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨  b^{2, 538}_0
c  in DIMACS:
 6257  6258  6259  1074  6260 0
 6257  6258  6259  1074 -6261 0
 6257  6258  6259  1074  6262 0

c  -1-1 --> -2
c    ( b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧  b^{2, 537}_0 ∧ -p_1074) -> ( b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0)
c  in CNF:
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨  b^{2, 538}_2
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨  b^{2, 538}_1
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨  p_1074 ∨ -b^{2, 538}_0
c  in DIMACS:
-6257  6258 -6259  1074  6260 0
-6257  6258 -6259  1074  6261 0
-6257  6258 -6259  1074 -6262 0

c  -2-1 --> break 
c    ( b^{2, 537}_2 ∧  b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨  b^{2, 537}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-6257 -6258  6259  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 537}_2 ∧ -b^{2, 537}_1 ∧ -b^{2, 537}_0 ∧ true) 
c  in CNF:
c    -b^{2, 537}_2 ∨  b^{2, 537}_1 ∨  b^{2, 537}_0 ∨ false 
c  in DIMACS:
-6257  6258  6259  0

c  3 does not represent an automaton state.
c    -(-b^{2, 537}_2 ∧  b^{2, 537}_1 ∧  b^{2, 537}_0 ∧ true) 
c  in CNF:
c     b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ false 
c  in DIMACS:
 6257 -6258 -6259  0
c  -3 does not represent an automaton state.
c    -( b^{2, 537}_2 ∧  b^{2, 537}_1 ∧  b^{2, 537}_0 ∧ true) 
c  in CNF:
c    -b^{2, 537}_2 ∨ -b^{2, 537}_1 ∨ -b^{2, 537}_0 ∨ false 
c  in DIMACS:
-6257 -6258 -6259  0

c i = 538
c  -2+1 --> -1
c    ( b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧  p_1076) -> ( b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0)
c  in CNF:
c    -b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨  b^{2, 539}_2
c    -b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_1
c    -b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨  b^{2, 539}_0
c  in DIMACS:
-6260 -6261  6262 -1076  6263 0
-6260 -6261  6262 -1076 -6264 0
-6260 -6261  6262 -1076  6265 0

c  -1+1 --> 0
c    ( b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0 ∧  p_1076) -> (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧ -b^{2, 539}_0)
c  in CNF:
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_2
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_1
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_0
c  in DIMACS:
-6260  6261 -6262 -1076 -6263 0
-6260  6261 -6262 -1076 -6264 0
-6260  6261 -6262 -1076 -6265 0

c  0+1 --> 1
c    (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧  p_1076) -> (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0)
c  in CNF:
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_2
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_1
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨  b^{2, 539}_0
c  in DIMACS:
 6260  6261  6262 -1076 -6263 0
 6260  6261  6262 -1076 -6264 0
 6260  6261  6262 -1076  6265 0

c  1+1 --> 2
c    (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0 ∧  p_1076) -> (-b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0)
c  in CNF:
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_2
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨  b^{2, 539}_1
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ -p_1076 ∨ -b^{2, 539}_0
c  in DIMACS:
 6260  6261 -6262 -1076 -6263 0
 6260  6261 -6262 -1076  6264 0
 6260  6261 -6262 -1076 -6265 0

c  2+1 --> break 
c    (-b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧  p_1076) -> break
c  in CNF:
c     b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ -p_1076 ∨ break
c  in DIMACS:
 6260 -6261  6262 -1076 1162 0


c  2-1 --> 1
c    (-b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧ -p_1076) -> (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0)
c  in CNF:
c     b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_2
c     b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_1
c     b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨  b^{2, 539}_0
c  in DIMACS:
 6260 -6261  6262  1076 -6263 0
 6260 -6261  6262  1076 -6264 0
 6260 -6261  6262  1076  6265 0

c  1-1 --> 0
c    (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0 ∧ -p_1076) -> (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧ -b^{2, 539}_0)
c  in CNF:
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_2
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_1
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_0
c  in DIMACS:
 6260  6261 -6262  1076 -6263 0
 6260  6261 -6262  1076 -6264 0
 6260  6261 -6262  1076 -6265 0

c  0-1 --> -1
c    (-b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧ -p_1076) -> ( b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0)
c  in CNF:
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨  b^{2, 539}_2
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_1
c     b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨  b^{2, 539}_0
c  in DIMACS:
 6260  6261  6262  1076  6263 0
 6260  6261  6262  1076 -6264 0
 6260  6261  6262  1076  6265 0

c  -1-1 --> -2
c    ( b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧  b^{2, 538}_0 ∧ -p_1076) -> ( b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0)
c  in CNF:
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨  b^{2, 539}_2
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨  b^{2, 539}_1
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨  p_1076 ∨ -b^{2, 539}_0
c  in DIMACS:
-6260  6261 -6262  1076  6263 0
-6260  6261 -6262  1076  6264 0
-6260  6261 -6262  1076 -6265 0

c  -2-1 --> break 
c    ( b^{2, 538}_2 ∧  b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧ -p_1076) -> break
c  in CNF:
c    -b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨  b^{2, 538}_0 ∨  p_1076 ∨ break
c  in DIMACS:
-6260 -6261  6262  1076 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 538}_2 ∧ -b^{2, 538}_1 ∧ -b^{2, 538}_0 ∧ true) 
c  in CNF:
c    -b^{2, 538}_2 ∨  b^{2, 538}_1 ∨  b^{2, 538}_0 ∨ false 
c  in DIMACS:
-6260  6261  6262  0

c  3 does not represent an automaton state.
c    -(-b^{2, 538}_2 ∧  b^{2, 538}_1 ∧  b^{2, 538}_0 ∧ true) 
c  in CNF:
c     b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ false 
c  in DIMACS:
 6260 -6261 -6262  0
c  -3 does not represent an automaton state.
c    -( b^{2, 538}_2 ∧  b^{2, 538}_1 ∧  b^{2, 538}_0 ∧ true) 
c  in CNF:
c    -b^{2, 538}_2 ∨ -b^{2, 538}_1 ∨ -b^{2, 538}_0 ∨ false 
c  in DIMACS:
-6260 -6261 -6262  0

c i = 539
c  -2+1 --> -1
c    ( b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧  p_1078) -> ( b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0)
c  in CNF:
c    -b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨  b^{2, 540}_2
c    -b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_1
c    -b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨  b^{2, 540}_0
c  in DIMACS:
-6263 -6264  6265 -1078  6266 0
-6263 -6264  6265 -1078 -6267 0
-6263 -6264  6265 -1078  6268 0

c  -1+1 --> 0
c    ( b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0 ∧  p_1078) -> (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧ -b^{2, 540}_0)
c  in CNF:
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_2
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_1
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_0
c  in DIMACS:
-6263  6264 -6265 -1078 -6266 0
-6263  6264 -6265 -1078 -6267 0
-6263  6264 -6265 -1078 -6268 0

c  0+1 --> 1
c    (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧  p_1078) -> (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0)
c  in CNF:
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_2
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_1
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨  b^{2, 540}_0
c  in DIMACS:
 6263  6264  6265 -1078 -6266 0
 6263  6264  6265 -1078 -6267 0
 6263  6264  6265 -1078  6268 0

c  1+1 --> 2
c    (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0 ∧  p_1078) -> (-b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0)
c  in CNF:
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_2
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨  b^{2, 540}_1
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ -p_1078 ∨ -b^{2, 540}_0
c  in DIMACS:
 6263  6264 -6265 -1078 -6266 0
 6263  6264 -6265 -1078  6267 0
 6263  6264 -6265 -1078 -6268 0

c  2+1 --> break 
c    (-b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 6263 -6264  6265 -1078 1162 0


c  2-1 --> 1
c    (-b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧ -p_1078) -> (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0)
c  in CNF:
c     b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_2
c     b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_1
c     b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨  b^{2, 540}_0
c  in DIMACS:
 6263 -6264  6265  1078 -6266 0
 6263 -6264  6265  1078 -6267 0
 6263 -6264  6265  1078  6268 0

c  1-1 --> 0
c    (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0 ∧ -p_1078) -> (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧ -b^{2, 540}_0)
c  in CNF:
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_2
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_1
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_0
c  in DIMACS:
 6263  6264 -6265  1078 -6266 0
 6263  6264 -6265  1078 -6267 0
 6263  6264 -6265  1078 -6268 0

c  0-1 --> -1
c    (-b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧ -p_1078) -> ( b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0)
c  in CNF:
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨  b^{2, 540}_2
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_1
c     b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨  b^{2, 540}_0
c  in DIMACS:
 6263  6264  6265  1078  6266 0
 6263  6264  6265  1078 -6267 0
 6263  6264  6265  1078  6268 0

c  -1-1 --> -2
c    ( b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧  b^{2, 539}_0 ∧ -p_1078) -> ( b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0)
c  in CNF:
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨  b^{2, 540}_2
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨  b^{2, 540}_1
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨  p_1078 ∨ -b^{2, 540}_0
c  in DIMACS:
-6263  6264 -6265  1078  6266 0
-6263  6264 -6265  1078  6267 0
-6263  6264 -6265  1078 -6268 0

c  -2-1 --> break 
c    ( b^{2, 539}_2 ∧  b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨  b^{2, 539}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-6263 -6264  6265  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 539}_2 ∧ -b^{2, 539}_1 ∧ -b^{2, 539}_0 ∧ true) 
c  in CNF:
c    -b^{2, 539}_2 ∨  b^{2, 539}_1 ∨  b^{2, 539}_0 ∨ false 
c  in DIMACS:
-6263  6264  6265  0

c  3 does not represent an automaton state.
c    -(-b^{2, 539}_2 ∧  b^{2, 539}_1 ∧  b^{2, 539}_0 ∧ true) 
c  in CNF:
c     b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ false 
c  in DIMACS:
 6263 -6264 -6265  0
c  -3 does not represent an automaton state.
c    -( b^{2, 539}_2 ∧  b^{2, 539}_1 ∧  b^{2, 539}_0 ∧ true) 
c  in CNF:
c    -b^{2, 539}_2 ∨ -b^{2, 539}_1 ∨ -b^{2, 539}_0 ∨ false 
c  in DIMACS:
-6263 -6264 -6265  0

c i = 540
c  -2+1 --> -1
c    ( b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧  p_1080) -> ( b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0)
c  in CNF:
c    -b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨  b^{2, 541}_2
c    -b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_1
c    -b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨  b^{2, 541}_0
c  in DIMACS:
-6266 -6267  6268 -1080  6269 0
-6266 -6267  6268 -1080 -6270 0
-6266 -6267  6268 -1080  6271 0

c  -1+1 --> 0
c    ( b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0 ∧  p_1080) -> (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧ -b^{2, 541}_0)
c  in CNF:
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_2
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_1
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_0
c  in DIMACS:
-6266  6267 -6268 -1080 -6269 0
-6266  6267 -6268 -1080 -6270 0
-6266  6267 -6268 -1080 -6271 0

c  0+1 --> 1
c    (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧  p_1080) -> (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0)
c  in CNF:
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_2
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_1
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨  b^{2, 541}_0
c  in DIMACS:
 6266  6267  6268 -1080 -6269 0
 6266  6267  6268 -1080 -6270 0
 6266  6267  6268 -1080  6271 0

c  1+1 --> 2
c    (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0 ∧  p_1080) -> (-b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0)
c  in CNF:
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_2
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨  b^{2, 541}_1
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ -p_1080 ∨ -b^{2, 541}_0
c  in DIMACS:
 6266  6267 -6268 -1080 -6269 0
 6266  6267 -6268 -1080  6270 0
 6266  6267 -6268 -1080 -6271 0

c  2+1 --> break 
c    (-b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 6266 -6267  6268 -1080 1162 0


c  2-1 --> 1
c    (-b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧ -p_1080) -> (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0)
c  in CNF:
c     b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_2
c     b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_1
c     b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨  b^{2, 541}_0
c  in DIMACS:
 6266 -6267  6268  1080 -6269 0
 6266 -6267  6268  1080 -6270 0
 6266 -6267  6268  1080  6271 0

c  1-1 --> 0
c    (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0 ∧ -p_1080) -> (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧ -b^{2, 541}_0)
c  in CNF:
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_2
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_1
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_0
c  in DIMACS:
 6266  6267 -6268  1080 -6269 0
 6266  6267 -6268  1080 -6270 0
 6266  6267 -6268  1080 -6271 0

c  0-1 --> -1
c    (-b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧ -p_1080) -> ( b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0)
c  in CNF:
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨  b^{2, 541}_2
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_1
c     b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨  b^{2, 541}_0
c  in DIMACS:
 6266  6267  6268  1080  6269 0
 6266  6267  6268  1080 -6270 0
 6266  6267  6268  1080  6271 0

c  -1-1 --> -2
c    ( b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧  b^{2, 540}_0 ∧ -p_1080) -> ( b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0)
c  in CNF:
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨  b^{2, 541}_2
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨  b^{2, 541}_1
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨  p_1080 ∨ -b^{2, 541}_0
c  in DIMACS:
-6266  6267 -6268  1080  6269 0
-6266  6267 -6268  1080  6270 0
-6266  6267 -6268  1080 -6271 0

c  -2-1 --> break 
c    ( b^{2, 540}_2 ∧  b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨  b^{2, 540}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-6266 -6267  6268  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 540}_2 ∧ -b^{2, 540}_1 ∧ -b^{2, 540}_0 ∧ true) 
c  in CNF:
c    -b^{2, 540}_2 ∨  b^{2, 540}_1 ∨  b^{2, 540}_0 ∨ false 
c  in DIMACS:
-6266  6267  6268  0

c  3 does not represent an automaton state.
c    -(-b^{2, 540}_2 ∧  b^{2, 540}_1 ∧  b^{2, 540}_0 ∧ true) 
c  in CNF:
c     b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ false 
c  in DIMACS:
 6266 -6267 -6268  0
c  -3 does not represent an automaton state.
c    -( b^{2, 540}_2 ∧  b^{2, 540}_1 ∧  b^{2, 540}_0 ∧ true) 
c  in CNF:
c    -b^{2, 540}_2 ∨ -b^{2, 540}_1 ∨ -b^{2, 540}_0 ∨ false 
c  in DIMACS:
-6266 -6267 -6268  0

c i = 541
c  -2+1 --> -1
c    ( b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧  p_1082) -> ( b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0)
c  in CNF:
c    -b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨  b^{2, 542}_2
c    -b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_1
c    -b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨  b^{2, 542}_0
c  in DIMACS:
-6269 -6270  6271 -1082  6272 0
-6269 -6270  6271 -1082 -6273 0
-6269 -6270  6271 -1082  6274 0

c  -1+1 --> 0
c    ( b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0 ∧  p_1082) -> (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧ -b^{2, 542}_0)
c  in CNF:
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_2
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_1
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_0
c  in DIMACS:
-6269  6270 -6271 -1082 -6272 0
-6269  6270 -6271 -1082 -6273 0
-6269  6270 -6271 -1082 -6274 0

c  0+1 --> 1
c    (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧  p_1082) -> (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0)
c  in CNF:
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_2
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_1
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨  b^{2, 542}_0
c  in DIMACS:
 6269  6270  6271 -1082 -6272 0
 6269  6270  6271 -1082 -6273 0
 6269  6270  6271 -1082  6274 0

c  1+1 --> 2
c    (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0 ∧  p_1082) -> (-b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0)
c  in CNF:
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_2
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨  b^{2, 542}_1
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ -p_1082 ∨ -b^{2, 542}_0
c  in DIMACS:
 6269  6270 -6271 -1082 -6272 0
 6269  6270 -6271 -1082  6273 0
 6269  6270 -6271 -1082 -6274 0

c  2+1 --> break 
c    (-b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧  p_1082) -> break
c  in CNF:
c     b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ -p_1082 ∨ break
c  in DIMACS:
 6269 -6270  6271 -1082 1162 0


c  2-1 --> 1
c    (-b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧ -p_1082) -> (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0)
c  in CNF:
c     b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_2
c     b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_1
c     b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨  b^{2, 542}_0
c  in DIMACS:
 6269 -6270  6271  1082 -6272 0
 6269 -6270  6271  1082 -6273 0
 6269 -6270  6271  1082  6274 0

c  1-1 --> 0
c    (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0 ∧ -p_1082) -> (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧ -b^{2, 542}_0)
c  in CNF:
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_2
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_1
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_0
c  in DIMACS:
 6269  6270 -6271  1082 -6272 0
 6269  6270 -6271  1082 -6273 0
 6269  6270 -6271  1082 -6274 0

c  0-1 --> -1
c    (-b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧ -p_1082) -> ( b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0)
c  in CNF:
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨  b^{2, 542}_2
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_1
c     b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨  b^{2, 542}_0
c  in DIMACS:
 6269  6270  6271  1082  6272 0
 6269  6270  6271  1082 -6273 0
 6269  6270  6271  1082  6274 0

c  -1-1 --> -2
c    ( b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧  b^{2, 541}_0 ∧ -p_1082) -> ( b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0)
c  in CNF:
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨  b^{2, 542}_2
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨  b^{2, 542}_1
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨  p_1082 ∨ -b^{2, 542}_0
c  in DIMACS:
-6269  6270 -6271  1082  6272 0
-6269  6270 -6271  1082  6273 0
-6269  6270 -6271  1082 -6274 0

c  -2-1 --> break 
c    ( b^{2, 541}_2 ∧  b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧ -p_1082) -> break
c  in CNF:
c    -b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨  b^{2, 541}_0 ∨  p_1082 ∨ break
c  in DIMACS:
-6269 -6270  6271  1082 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 541}_2 ∧ -b^{2, 541}_1 ∧ -b^{2, 541}_0 ∧ true) 
c  in CNF:
c    -b^{2, 541}_2 ∨  b^{2, 541}_1 ∨  b^{2, 541}_0 ∨ false 
c  in DIMACS:
-6269  6270  6271  0

c  3 does not represent an automaton state.
c    -(-b^{2, 541}_2 ∧  b^{2, 541}_1 ∧  b^{2, 541}_0 ∧ true) 
c  in CNF:
c     b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ false 
c  in DIMACS:
 6269 -6270 -6271  0
c  -3 does not represent an automaton state.
c    -( b^{2, 541}_2 ∧  b^{2, 541}_1 ∧  b^{2, 541}_0 ∧ true) 
c  in CNF:
c    -b^{2, 541}_2 ∨ -b^{2, 541}_1 ∨ -b^{2, 541}_0 ∨ false 
c  in DIMACS:
-6269 -6270 -6271  0

c i = 542
c  -2+1 --> -1
c    ( b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧  p_1084) -> ( b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0)
c  in CNF:
c    -b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨  b^{2, 543}_2
c    -b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_1
c    -b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨  b^{2, 543}_0
c  in DIMACS:
-6272 -6273  6274 -1084  6275 0
-6272 -6273  6274 -1084 -6276 0
-6272 -6273  6274 -1084  6277 0

c  -1+1 --> 0
c    ( b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0 ∧  p_1084) -> (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧ -b^{2, 543}_0)
c  in CNF:
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_2
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_1
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_0
c  in DIMACS:
-6272  6273 -6274 -1084 -6275 0
-6272  6273 -6274 -1084 -6276 0
-6272  6273 -6274 -1084 -6277 0

c  0+1 --> 1
c    (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧  p_1084) -> (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0)
c  in CNF:
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_2
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_1
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨  b^{2, 543}_0
c  in DIMACS:
 6272  6273  6274 -1084 -6275 0
 6272  6273  6274 -1084 -6276 0
 6272  6273  6274 -1084  6277 0

c  1+1 --> 2
c    (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0 ∧  p_1084) -> (-b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0)
c  in CNF:
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_2
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨  b^{2, 543}_1
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ -p_1084 ∨ -b^{2, 543}_0
c  in DIMACS:
 6272  6273 -6274 -1084 -6275 0
 6272  6273 -6274 -1084  6276 0
 6272  6273 -6274 -1084 -6277 0

c  2+1 --> break 
c    (-b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧  p_1084) -> break
c  in CNF:
c     b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ -p_1084 ∨ break
c  in DIMACS:
 6272 -6273  6274 -1084 1162 0


c  2-1 --> 1
c    (-b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧ -p_1084) -> (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0)
c  in CNF:
c     b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_2
c     b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_1
c     b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨  b^{2, 543}_0
c  in DIMACS:
 6272 -6273  6274  1084 -6275 0
 6272 -6273  6274  1084 -6276 0
 6272 -6273  6274  1084  6277 0

c  1-1 --> 0
c    (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0 ∧ -p_1084) -> (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧ -b^{2, 543}_0)
c  in CNF:
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_2
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_1
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_0
c  in DIMACS:
 6272  6273 -6274  1084 -6275 0
 6272  6273 -6274  1084 -6276 0
 6272  6273 -6274  1084 -6277 0

c  0-1 --> -1
c    (-b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧ -p_1084) -> ( b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0)
c  in CNF:
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨  b^{2, 543}_2
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_1
c     b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨  b^{2, 543}_0
c  in DIMACS:
 6272  6273  6274  1084  6275 0
 6272  6273  6274  1084 -6276 0
 6272  6273  6274  1084  6277 0

c  -1-1 --> -2
c    ( b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧  b^{2, 542}_0 ∧ -p_1084) -> ( b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0)
c  in CNF:
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨  b^{2, 543}_2
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨  b^{2, 543}_1
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨  p_1084 ∨ -b^{2, 543}_0
c  in DIMACS:
-6272  6273 -6274  1084  6275 0
-6272  6273 -6274  1084  6276 0
-6272  6273 -6274  1084 -6277 0

c  -2-1 --> break 
c    ( b^{2, 542}_2 ∧  b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧ -p_1084) -> break
c  in CNF:
c    -b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨  b^{2, 542}_0 ∨  p_1084 ∨ break
c  in DIMACS:
-6272 -6273  6274  1084 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 542}_2 ∧ -b^{2, 542}_1 ∧ -b^{2, 542}_0 ∧ true) 
c  in CNF:
c    -b^{2, 542}_2 ∨  b^{2, 542}_1 ∨  b^{2, 542}_0 ∨ false 
c  in DIMACS:
-6272  6273  6274  0

c  3 does not represent an automaton state.
c    -(-b^{2, 542}_2 ∧  b^{2, 542}_1 ∧  b^{2, 542}_0 ∧ true) 
c  in CNF:
c     b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ false 
c  in DIMACS:
 6272 -6273 -6274  0
c  -3 does not represent an automaton state.
c    -( b^{2, 542}_2 ∧  b^{2, 542}_1 ∧  b^{2, 542}_0 ∧ true) 
c  in CNF:
c    -b^{2, 542}_2 ∨ -b^{2, 542}_1 ∨ -b^{2, 542}_0 ∨ false 
c  in DIMACS:
-6272 -6273 -6274  0

c i = 543
c  -2+1 --> -1
c    ( b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧  p_1086) -> ( b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0)
c  in CNF:
c    -b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨  b^{2, 544}_2
c    -b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_1
c    -b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨  b^{2, 544}_0
c  in DIMACS:
-6275 -6276  6277 -1086  6278 0
-6275 -6276  6277 -1086 -6279 0
-6275 -6276  6277 -1086  6280 0

c  -1+1 --> 0
c    ( b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0 ∧  p_1086) -> (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧ -b^{2, 544}_0)
c  in CNF:
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_2
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_1
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_0
c  in DIMACS:
-6275  6276 -6277 -1086 -6278 0
-6275  6276 -6277 -1086 -6279 0
-6275  6276 -6277 -1086 -6280 0

c  0+1 --> 1
c    (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧  p_1086) -> (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0)
c  in CNF:
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_2
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_1
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨  b^{2, 544}_0
c  in DIMACS:
 6275  6276  6277 -1086 -6278 0
 6275  6276  6277 -1086 -6279 0
 6275  6276  6277 -1086  6280 0

c  1+1 --> 2
c    (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0 ∧  p_1086) -> (-b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0)
c  in CNF:
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_2
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨  b^{2, 544}_1
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ -p_1086 ∨ -b^{2, 544}_0
c  in DIMACS:
 6275  6276 -6277 -1086 -6278 0
 6275  6276 -6277 -1086  6279 0
 6275  6276 -6277 -1086 -6280 0

c  2+1 --> break 
c    (-b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 6275 -6276  6277 -1086 1162 0


c  2-1 --> 1
c    (-b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧ -p_1086) -> (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0)
c  in CNF:
c     b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_2
c     b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_1
c     b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨  b^{2, 544}_0
c  in DIMACS:
 6275 -6276  6277  1086 -6278 0
 6275 -6276  6277  1086 -6279 0
 6275 -6276  6277  1086  6280 0

c  1-1 --> 0
c    (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0 ∧ -p_1086) -> (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧ -b^{2, 544}_0)
c  in CNF:
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_2
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_1
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_0
c  in DIMACS:
 6275  6276 -6277  1086 -6278 0
 6275  6276 -6277  1086 -6279 0
 6275  6276 -6277  1086 -6280 0

c  0-1 --> -1
c    (-b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧ -p_1086) -> ( b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0)
c  in CNF:
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨  b^{2, 544}_2
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_1
c     b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨  b^{2, 544}_0
c  in DIMACS:
 6275  6276  6277  1086  6278 0
 6275  6276  6277  1086 -6279 0
 6275  6276  6277  1086  6280 0

c  -1-1 --> -2
c    ( b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧  b^{2, 543}_0 ∧ -p_1086) -> ( b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0)
c  in CNF:
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨  b^{2, 544}_2
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨  b^{2, 544}_1
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨  p_1086 ∨ -b^{2, 544}_0
c  in DIMACS:
-6275  6276 -6277  1086  6278 0
-6275  6276 -6277  1086  6279 0
-6275  6276 -6277  1086 -6280 0

c  -2-1 --> break 
c    ( b^{2, 543}_2 ∧  b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨  b^{2, 543}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-6275 -6276  6277  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 543}_2 ∧ -b^{2, 543}_1 ∧ -b^{2, 543}_0 ∧ true) 
c  in CNF:
c    -b^{2, 543}_2 ∨  b^{2, 543}_1 ∨  b^{2, 543}_0 ∨ false 
c  in DIMACS:
-6275  6276  6277  0

c  3 does not represent an automaton state.
c    -(-b^{2, 543}_2 ∧  b^{2, 543}_1 ∧  b^{2, 543}_0 ∧ true) 
c  in CNF:
c     b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ false 
c  in DIMACS:
 6275 -6276 -6277  0
c  -3 does not represent an automaton state.
c    -( b^{2, 543}_2 ∧  b^{2, 543}_1 ∧  b^{2, 543}_0 ∧ true) 
c  in CNF:
c    -b^{2, 543}_2 ∨ -b^{2, 543}_1 ∨ -b^{2, 543}_0 ∨ false 
c  in DIMACS:
-6275 -6276 -6277  0

c i = 544
c  -2+1 --> -1
c    ( b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧  p_1088) -> ( b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0)
c  in CNF:
c    -b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨  b^{2, 545}_2
c    -b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_1
c    -b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨  b^{2, 545}_0
c  in DIMACS:
-6278 -6279  6280 -1088  6281 0
-6278 -6279  6280 -1088 -6282 0
-6278 -6279  6280 -1088  6283 0

c  -1+1 --> 0
c    ( b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0 ∧  p_1088) -> (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧ -b^{2, 545}_0)
c  in CNF:
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_2
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_1
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_0
c  in DIMACS:
-6278  6279 -6280 -1088 -6281 0
-6278  6279 -6280 -1088 -6282 0
-6278  6279 -6280 -1088 -6283 0

c  0+1 --> 1
c    (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧  p_1088) -> (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0)
c  in CNF:
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_2
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_1
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨  b^{2, 545}_0
c  in DIMACS:
 6278  6279  6280 -1088 -6281 0
 6278  6279  6280 -1088 -6282 0
 6278  6279  6280 -1088  6283 0

c  1+1 --> 2
c    (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0 ∧  p_1088) -> (-b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0)
c  in CNF:
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_2
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨  b^{2, 545}_1
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ -p_1088 ∨ -b^{2, 545}_0
c  in DIMACS:
 6278  6279 -6280 -1088 -6281 0
 6278  6279 -6280 -1088  6282 0
 6278  6279 -6280 -1088 -6283 0

c  2+1 --> break 
c    (-b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 6278 -6279  6280 -1088 1162 0


c  2-1 --> 1
c    (-b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧ -p_1088) -> (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0)
c  in CNF:
c     b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_2
c     b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_1
c     b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨  b^{2, 545}_0
c  in DIMACS:
 6278 -6279  6280  1088 -6281 0
 6278 -6279  6280  1088 -6282 0
 6278 -6279  6280  1088  6283 0

c  1-1 --> 0
c    (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0 ∧ -p_1088) -> (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧ -b^{2, 545}_0)
c  in CNF:
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_2
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_1
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_0
c  in DIMACS:
 6278  6279 -6280  1088 -6281 0
 6278  6279 -6280  1088 -6282 0
 6278  6279 -6280  1088 -6283 0

c  0-1 --> -1
c    (-b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧ -p_1088) -> ( b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0)
c  in CNF:
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨  b^{2, 545}_2
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_1
c     b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨  b^{2, 545}_0
c  in DIMACS:
 6278  6279  6280  1088  6281 0
 6278  6279  6280  1088 -6282 0
 6278  6279  6280  1088  6283 0

c  -1-1 --> -2
c    ( b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧  b^{2, 544}_0 ∧ -p_1088) -> ( b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0)
c  in CNF:
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨  b^{2, 545}_2
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨  b^{2, 545}_1
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨  p_1088 ∨ -b^{2, 545}_0
c  in DIMACS:
-6278  6279 -6280  1088  6281 0
-6278  6279 -6280  1088  6282 0
-6278  6279 -6280  1088 -6283 0

c  -2-1 --> break 
c    ( b^{2, 544}_2 ∧  b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨  b^{2, 544}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-6278 -6279  6280  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 544}_2 ∧ -b^{2, 544}_1 ∧ -b^{2, 544}_0 ∧ true) 
c  in CNF:
c    -b^{2, 544}_2 ∨  b^{2, 544}_1 ∨  b^{2, 544}_0 ∨ false 
c  in DIMACS:
-6278  6279  6280  0

c  3 does not represent an automaton state.
c    -(-b^{2, 544}_2 ∧  b^{2, 544}_1 ∧  b^{2, 544}_0 ∧ true) 
c  in CNF:
c     b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ false 
c  in DIMACS:
 6278 -6279 -6280  0
c  -3 does not represent an automaton state.
c    -( b^{2, 544}_2 ∧  b^{2, 544}_1 ∧  b^{2, 544}_0 ∧ true) 
c  in CNF:
c    -b^{2, 544}_2 ∨ -b^{2, 544}_1 ∨ -b^{2, 544}_0 ∨ false 
c  in DIMACS:
-6278 -6279 -6280  0

c i = 545
c  -2+1 --> -1
c    ( b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧  p_1090) -> ( b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0)
c  in CNF:
c    -b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨  b^{2, 546}_2
c    -b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_1
c    -b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨  b^{2, 546}_0
c  in DIMACS:
-6281 -6282  6283 -1090  6284 0
-6281 -6282  6283 -1090 -6285 0
-6281 -6282  6283 -1090  6286 0

c  -1+1 --> 0
c    ( b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0 ∧  p_1090) -> (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧ -b^{2, 546}_0)
c  in CNF:
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_2
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_1
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_0
c  in DIMACS:
-6281  6282 -6283 -1090 -6284 0
-6281  6282 -6283 -1090 -6285 0
-6281  6282 -6283 -1090 -6286 0

c  0+1 --> 1
c    (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧  p_1090) -> (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0)
c  in CNF:
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_2
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_1
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨  b^{2, 546}_0
c  in DIMACS:
 6281  6282  6283 -1090 -6284 0
 6281  6282  6283 -1090 -6285 0
 6281  6282  6283 -1090  6286 0

c  1+1 --> 2
c    (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0 ∧  p_1090) -> (-b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0)
c  in CNF:
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_2
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨  b^{2, 546}_1
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ -p_1090 ∨ -b^{2, 546}_0
c  in DIMACS:
 6281  6282 -6283 -1090 -6284 0
 6281  6282 -6283 -1090  6285 0
 6281  6282 -6283 -1090 -6286 0

c  2+1 --> break 
c    (-b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 6281 -6282  6283 -1090 1162 0


c  2-1 --> 1
c    (-b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧ -p_1090) -> (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0)
c  in CNF:
c     b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_2
c     b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_1
c     b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨  b^{2, 546}_0
c  in DIMACS:
 6281 -6282  6283  1090 -6284 0
 6281 -6282  6283  1090 -6285 0
 6281 -6282  6283  1090  6286 0

c  1-1 --> 0
c    (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0 ∧ -p_1090) -> (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧ -b^{2, 546}_0)
c  in CNF:
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_2
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_1
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_0
c  in DIMACS:
 6281  6282 -6283  1090 -6284 0
 6281  6282 -6283  1090 -6285 0
 6281  6282 -6283  1090 -6286 0

c  0-1 --> -1
c    (-b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧ -p_1090) -> ( b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0)
c  in CNF:
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨  b^{2, 546}_2
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_1
c     b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨  b^{2, 546}_0
c  in DIMACS:
 6281  6282  6283  1090  6284 0
 6281  6282  6283  1090 -6285 0
 6281  6282  6283  1090  6286 0

c  -1-1 --> -2
c    ( b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧  b^{2, 545}_0 ∧ -p_1090) -> ( b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0)
c  in CNF:
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨  b^{2, 546}_2
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨  b^{2, 546}_1
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨  p_1090 ∨ -b^{2, 546}_0
c  in DIMACS:
-6281  6282 -6283  1090  6284 0
-6281  6282 -6283  1090  6285 0
-6281  6282 -6283  1090 -6286 0

c  -2-1 --> break 
c    ( b^{2, 545}_2 ∧  b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨  b^{2, 545}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-6281 -6282  6283  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 545}_2 ∧ -b^{2, 545}_1 ∧ -b^{2, 545}_0 ∧ true) 
c  in CNF:
c    -b^{2, 545}_2 ∨  b^{2, 545}_1 ∨  b^{2, 545}_0 ∨ false 
c  in DIMACS:
-6281  6282  6283  0

c  3 does not represent an automaton state.
c    -(-b^{2, 545}_2 ∧  b^{2, 545}_1 ∧  b^{2, 545}_0 ∧ true) 
c  in CNF:
c     b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ false 
c  in DIMACS:
 6281 -6282 -6283  0
c  -3 does not represent an automaton state.
c    -( b^{2, 545}_2 ∧  b^{2, 545}_1 ∧  b^{2, 545}_0 ∧ true) 
c  in CNF:
c    -b^{2, 545}_2 ∨ -b^{2, 545}_1 ∨ -b^{2, 545}_0 ∨ false 
c  in DIMACS:
-6281 -6282 -6283  0

c i = 546
c  -2+1 --> -1
c    ( b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧  p_1092) -> ( b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0)
c  in CNF:
c    -b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨  b^{2, 547}_2
c    -b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_1
c    -b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨  b^{2, 547}_0
c  in DIMACS:
-6284 -6285  6286 -1092  6287 0
-6284 -6285  6286 -1092 -6288 0
-6284 -6285  6286 -1092  6289 0

c  -1+1 --> 0
c    ( b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0 ∧  p_1092) -> (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧ -b^{2, 547}_0)
c  in CNF:
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_2
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_1
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_0
c  in DIMACS:
-6284  6285 -6286 -1092 -6287 0
-6284  6285 -6286 -1092 -6288 0
-6284  6285 -6286 -1092 -6289 0

c  0+1 --> 1
c    (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧  p_1092) -> (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0)
c  in CNF:
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_2
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_1
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨  b^{2, 547}_0
c  in DIMACS:
 6284  6285  6286 -1092 -6287 0
 6284  6285  6286 -1092 -6288 0
 6284  6285  6286 -1092  6289 0

c  1+1 --> 2
c    (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0 ∧  p_1092) -> (-b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0)
c  in CNF:
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_2
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨  b^{2, 547}_1
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ -p_1092 ∨ -b^{2, 547}_0
c  in DIMACS:
 6284  6285 -6286 -1092 -6287 0
 6284  6285 -6286 -1092  6288 0
 6284  6285 -6286 -1092 -6289 0

c  2+1 --> break 
c    (-b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 6284 -6285  6286 -1092 1162 0


c  2-1 --> 1
c    (-b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧ -p_1092) -> (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0)
c  in CNF:
c     b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_2
c     b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_1
c     b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨  b^{2, 547}_0
c  in DIMACS:
 6284 -6285  6286  1092 -6287 0
 6284 -6285  6286  1092 -6288 0
 6284 -6285  6286  1092  6289 0

c  1-1 --> 0
c    (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0 ∧ -p_1092) -> (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧ -b^{2, 547}_0)
c  in CNF:
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_2
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_1
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_0
c  in DIMACS:
 6284  6285 -6286  1092 -6287 0
 6284  6285 -6286  1092 -6288 0
 6284  6285 -6286  1092 -6289 0

c  0-1 --> -1
c    (-b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧ -p_1092) -> ( b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0)
c  in CNF:
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨  b^{2, 547}_2
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_1
c     b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨  b^{2, 547}_0
c  in DIMACS:
 6284  6285  6286  1092  6287 0
 6284  6285  6286  1092 -6288 0
 6284  6285  6286  1092  6289 0

c  -1-1 --> -2
c    ( b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧  b^{2, 546}_0 ∧ -p_1092) -> ( b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0)
c  in CNF:
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨  b^{2, 547}_2
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨  b^{2, 547}_1
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨  p_1092 ∨ -b^{2, 547}_0
c  in DIMACS:
-6284  6285 -6286  1092  6287 0
-6284  6285 -6286  1092  6288 0
-6284  6285 -6286  1092 -6289 0

c  -2-1 --> break 
c    ( b^{2, 546}_2 ∧  b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨  b^{2, 546}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-6284 -6285  6286  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 546}_2 ∧ -b^{2, 546}_1 ∧ -b^{2, 546}_0 ∧ true) 
c  in CNF:
c    -b^{2, 546}_2 ∨  b^{2, 546}_1 ∨  b^{2, 546}_0 ∨ false 
c  in DIMACS:
-6284  6285  6286  0

c  3 does not represent an automaton state.
c    -(-b^{2, 546}_2 ∧  b^{2, 546}_1 ∧  b^{2, 546}_0 ∧ true) 
c  in CNF:
c     b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ false 
c  in DIMACS:
 6284 -6285 -6286  0
c  -3 does not represent an automaton state.
c    -( b^{2, 546}_2 ∧  b^{2, 546}_1 ∧  b^{2, 546}_0 ∧ true) 
c  in CNF:
c    -b^{2, 546}_2 ∨ -b^{2, 546}_1 ∨ -b^{2, 546}_0 ∨ false 
c  in DIMACS:
-6284 -6285 -6286  0

c i = 547
c  -2+1 --> -1
c    ( b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧  p_1094) -> ( b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0)
c  in CNF:
c    -b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨  b^{2, 548}_2
c    -b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_1
c    -b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨  b^{2, 548}_0
c  in DIMACS:
-6287 -6288  6289 -1094  6290 0
-6287 -6288  6289 -1094 -6291 0
-6287 -6288  6289 -1094  6292 0

c  -1+1 --> 0
c    ( b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0 ∧  p_1094) -> (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧ -b^{2, 548}_0)
c  in CNF:
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_2
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_1
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_0
c  in DIMACS:
-6287  6288 -6289 -1094 -6290 0
-6287  6288 -6289 -1094 -6291 0
-6287  6288 -6289 -1094 -6292 0

c  0+1 --> 1
c    (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧  p_1094) -> (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0)
c  in CNF:
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_2
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_1
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨  b^{2, 548}_0
c  in DIMACS:
 6287  6288  6289 -1094 -6290 0
 6287  6288  6289 -1094 -6291 0
 6287  6288  6289 -1094  6292 0

c  1+1 --> 2
c    (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0 ∧  p_1094) -> (-b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0)
c  in CNF:
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_2
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨  b^{2, 548}_1
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ -p_1094 ∨ -b^{2, 548}_0
c  in DIMACS:
 6287  6288 -6289 -1094 -6290 0
 6287  6288 -6289 -1094  6291 0
 6287  6288 -6289 -1094 -6292 0

c  2+1 --> break 
c    (-b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧  p_1094) -> break
c  in CNF:
c     b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ -p_1094 ∨ break
c  in DIMACS:
 6287 -6288  6289 -1094 1162 0


c  2-1 --> 1
c    (-b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧ -p_1094) -> (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0)
c  in CNF:
c     b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_2
c     b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_1
c     b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨  b^{2, 548}_0
c  in DIMACS:
 6287 -6288  6289  1094 -6290 0
 6287 -6288  6289  1094 -6291 0
 6287 -6288  6289  1094  6292 0

c  1-1 --> 0
c    (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0 ∧ -p_1094) -> (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧ -b^{2, 548}_0)
c  in CNF:
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_2
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_1
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_0
c  in DIMACS:
 6287  6288 -6289  1094 -6290 0
 6287  6288 -6289  1094 -6291 0
 6287  6288 -6289  1094 -6292 0

c  0-1 --> -1
c    (-b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧ -p_1094) -> ( b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0)
c  in CNF:
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨  b^{2, 548}_2
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_1
c     b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨  b^{2, 548}_0
c  in DIMACS:
 6287  6288  6289  1094  6290 0
 6287  6288  6289  1094 -6291 0
 6287  6288  6289  1094  6292 0

c  -1-1 --> -2
c    ( b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧  b^{2, 547}_0 ∧ -p_1094) -> ( b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0)
c  in CNF:
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨  b^{2, 548}_2
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨  b^{2, 548}_1
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨  p_1094 ∨ -b^{2, 548}_0
c  in DIMACS:
-6287  6288 -6289  1094  6290 0
-6287  6288 -6289  1094  6291 0
-6287  6288 -6289  1094 -6292 0

c  -2-1 --> break 
c    ( b^{2, 547}_2 ∧  b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧ -p_1094) -> break
c  in CNF:
c    -b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨  b^{2, 547}_0 ∨  p_1094 ∨ break
c  in DIMACS:
-6287 -6288  6289  1094 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 547}_2 ∧ -b^{2, 547}_1 ∧ -b^{2, 547}_0 ∧ true) 
c  in CNF:
c    -b^{2, 547}_2 ∨  b^{2, 547}_1 ∨  b^{2, 547}_0 ∨ false 
c  in DIMACS:
-6287  6288  6289  0

c  3 does not represent an automaton state.
c    -(-b^{2, 547}_2 ∧  b^{2, 547}_1 ∧  b^{2, 547}_0 ∧ true) 
c  in CNF:
c     b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ false 
c  in DIMACS:
 6287 -6288 -6289  0
c  -3 does not represent an automaton state.
c    -( b^{2, 547}_2 ∧  b^{2, 547}_1 ∧  b^{2, 547}_0 ∧ true) 
c  in CNF:
c    -b^{2, 547}_2 ∨ -b^{2, 547}_1 ∨ -b^{2, 547}_0 ∨ false 
c  in DIMACS:
-6287 -6288 -6289  0

c i = 548
c  -2+1 --> -1
c    ( b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧  p_1096) -> ( b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0)
c  in CNF:
c    -b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨  b^{2, 549}_2
c    -b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_1
c    -b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨  b^{2, 549}_0
c  in DIMACS:
-6290 -6291  6292 -1096  6293 0
-6290 -6291  6292 -1096 -6294 0
-6290 -6291  6292 -1096  6295 0

c  -1+1 --> 0
c    ( b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0 ∧  p_1096) -> (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧ -b^{2, 549}_0)
c  in CNF:
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_2
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_1
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_0
c  in DIMACS:
-6290  6291 -6292 -1096 -6293 0
-6290  6291 -6292 -1096 -6294 0
-6290  6291 -6292 -1096 -6295 0

c  0+1 --> 1
c    (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧  p_1096) -> (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0)
c  in CNF:
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_2
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_1
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨  b^{2, 549}_0
c  in DIMACS:
 6290  6291  6292 -1096 -6293 0
 6290  6291  6292 -1096 -6294 0
 6290  6291  6292 -1096  6295 0

c  1+1 --> 2
c    (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0 ∧  p_1096) -> (-b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0)
c  in CNF:
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_2
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨  b^{2, 549}_1
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ -p_1096 ∨ -b^{2, 549}_0
c  in DIMACS:
 6290  6291 -6292 -1096 -6293 0
 6290  6291 -6292 -1096  6294 0
 6290  6291 -6292 -1096 -6295 0

c  2+1 --> break 
c    (-b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 6290 -6291  6292 -1096 1162 0


c  2-1 --> 1
c    (-b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧ -p_1096) -> (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0)
c  in CNF:
c     b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_2
c     b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_1
c     b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨  b^{2, 549}_0
c  in DIMACS:
 6290 -6291  6292  1096 -6293 0
 6290 -6291  6292  1096 -6294 0
 6290 -6291  6292  1096  6295 0

c  1-1 --> 0
c    (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0 ∧ -p_1096) -> (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧ -b^{2, 549}_0)
c  in CNF:
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_2
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_1
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_0
c  in DIMACS:
 6290  6291 -6292  1096 -6293 0
 6290  6291 -6292  1096 -6294 0
 6290  6291 -6292  1096 -6295 0

c  0-1 --> -1
c    (-b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧ -p_1096) -> ( b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0)
c  in CNF:
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨  b^{2, 549}_2
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_1
c     b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨  b^{2, 549}_0
c  in DIMACS:
 6290  6291  6292  1096  6293 0
 6290  6291  6292  1096 -6294 0
 6290  6291  6292  1096  6295 0

c  -1-1 --> -2
c    ( b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧  b^{2, 548}_0 ∧ -p_1096) -> ( b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0)
c  in CNF:
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨  b^{2, 549}_2
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨  b^{2, 549}_1
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨  p_1096 ∨ -b^{2, 549}_0
c  in DIMACS:
-6290  6291 -6292  1096  6293 0
-6290  6291 -6292  1096  6294 0
-6290  6291 -6292  1096 -6295 0

c  -2-1 --> break 
c    ( b^{2, 548}_2 ∧  b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨  b^{2, 548}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-6290 -6291  6292  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 548}_2 ∧ -b^{2, 548}_1 ∧ -b^{2, 548}_0 ∧ true) 
c  in CNF:
c    -b^{2, 548}_2 ∨  b^{2, 548}_1 ∨  b^{2, 548}_0 ∨ false 
c  in DIMACS:
-6290  6291  6292  0

c  3 does not represent an automaton state.
c    -(-b^{2, 548}_2 ∧  b^{2, 548}_1 ∧  b^{2, 548}_0 ∧ true) 
c  in CNF:
c     b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ false 
c  in DIMACS:
 6290 -6291 -6292  0
c  -3 does not represent an automaton state.
c    -( b^{2, 548}_2 ∧  b^{2, 548}_1 ∧  b^{2, 548}_0 ∧ true) 
c  in CNF:
c    -b^{2, 548}_2 ∨ -b^{2, 548}_1 ∨ -b^{2, 548}_0 ∨ false 
c  in DIMACS:
-6290 -6291 -6292  0

c i = 549
c  -2+1 --> -1
c    ( b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧  p_1098) -> ( b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0)
c  in CNF:
c    -b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨  b^{2, 550}_2
c    -b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_1
c    -b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨  b^{2, 550}_0
c  in DIMACS:
-6293 -6294  6295 -1098  6296 0
-6293 -6294  6295 -1098 -6297 0
-6293 -6294  6295 -1098  6298 0

c  -1+1 --> 0
c    ( b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0 ∧  p_1098) -> (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧ -b^{2, 550}_0)
c  in CNF:
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_2
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_1
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_0
c  in DIMACS:
-6293  6294 -6295 -1098 -6296 0
-6293  6294 -6295 -1098 -6297 0
-6293  6294 -6295 -1098 -6298 0

c  0+1 --> 1
c    (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧  p_1098) -> (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0)
c  in CNF:
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_2
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_1
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨  b^{2, 550}_0
c  in DIMACS:
 6293  6294  6295 -1098 -6296 0
 6293  6294  6295 -1098 -6297 0
 6293  6294  6295 -1098  6298 0

c  1+1 --> 2
c    (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0 ∧  p_1098) -> (-b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0)
c  in CNF:
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_2
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨  b^{2, 550}_1
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ -p_1098 ∨ -b^{2, 550}_0
c  in DIMACS:
 6293  6294 -6295 -1098 -6296 0
 6293  6294 -6295 -1098  6297 0
 6293  6294 -6295 -1098 -6298 0

c  2+1 --> break 
c    (-b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 6293 -6294  6295 -1098 1162 0


c  2-1 --> 1
c    (-b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧ -p_1098) -> (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0)
c  in CNF:
c     b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_2
c     b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_1
c     b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨  b^{2, 550}_0
c  in DIMACS:
 6293 -6294  6295  1098 -6296 0
 6293 -6294  6295  1098 -6297 0
 6293 -6294  6295  1098  6298 0

c  1-1 --> 0
c    (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0 ∧ -p_1098) -> (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧ -b^{2, 550}_0)
c  in CNF:
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_2
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_1
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_0
c  in DIMACS:
 6293  6294 -6295  1098 -6296 0
 6293  6294 -6295  1098 -6297 0
 6293  6294 -6295  1098 -6298 0

c  0-1 --> -1
c    (-b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧ -p_1098) -> ( b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0)
c  in CNF:
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨  b^{2, 550}_2
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_1
c     b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨  b^{2, 550}_0
c  in DIMACS:
 6293  6294  6295  1098  6296 0
 6293  6294  6295  1098 -6297 0
 6293  6294  6295  1098  6298 0

c  -1-1 --> -2
c    ( b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧  b^{2, 549}_0 ∧ -p_1098) -> ( b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0)
c  in CNF:
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨  b^{2, 550}_2
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨  b^{2, 550}_1
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨  p_1098 ∨ -b^{2, 550}_0
c  in DIMACS:
-6293  6294 -6295  1098  6296 0
-6293  6294 -6295  1098  6297 0
-6293  6294 -6295  1098 -6298 0

c  -2-1 --> break 
c    ( b^{2, 549}_2 ∧  b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨  b^{2, 549}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-6293 -6294  6295  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 549}_2 ∧ -b^{2, 549}_1 ∧ -b^{2, 549}_0 ∧ true) 
c  in CNF:
c    -b^{2, 549}_2 ∨  b^{2, 549}_1 ∨  b^{2, 549}_0 ∨ false 
c  in DIMACS:
-6293  6294  6295  0

c  3 does not represent an automaton state.
c    -(-b^{2, 549}_2 ∧  b^{2, 549}_1 ∧  b^{2, 549}_0 ∧ true) 
c  in CNF:
c     b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ false 
c  in DIMACS:
 6293 -6294 -6295  0
c  -3 does not represent an automaton state.
c    -( b^{2, 549}_2 ∧  b^{2, 549}_1 ∧  b^{2, 549}_0 ∧ true) 
c  in CNF:
c    -b^{2, 549}_2 ∨ -b^{2, 549}_1 ∨ -b^{2, 549}_0 ∨ false 
c  in DIMACS:
-6293 -6294 -6295  0

c i = 550
c  -2+1 --> -1
c    ( b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧  p_1100) -> ( b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0)
c  in CNF:
c    -b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨  b^{2, 551}_2
c    -b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_1
c    -b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨  b^{2, 551}_0
c  in DIMACS:
-6296 -6297  6298 -1100  6299 0
-6296 -6297  6298 -1100 -6300 0
-6296 -6297  6298 -1100  6301 0

c  -1+1 --> 0
c    ( b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0 ∧  p_1100) -> (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧ -b^{2, 551}_0)
c  in CNF:
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_2
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_1
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_0
c  in DIMACS:
-6296  6297 -6298 -1100 -6299 0
-6296  6297 -6298 -1100 -6300 0
-6296  6297 -6298 -1100 -6301 0

c  0+1 --> 1
c    (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧  p_1100) -> (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0)
c  in CNF:
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_2
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_1
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨  b^{2, 551}_0
c  in DIMACS:
 6296  6297  6298 -1100 -6299 0
 6296  6297  6298 -1100 -6300 0
 6296  6297  6298 -1100  6301 0

c  1+1 --> 2
c    (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0 ∧  p_1100) -> (-b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0)
c  in CNF:
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_2
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨  b^{2, 551}_1
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ -p_1100 ∨ -b^{2, 551}_0
c  in DIMACS:
 6296  6297 -6298 -1100 -6299 0
 6296  6297 -6298 -1100  6300 0
 6296  6297 -6298 -1100 -6301 0

c  2+1 --> break 
c    (-b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 6296 -6297  6298 -1100 1162 0


c  2-1 --> 1
c    (-b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧ -p_1100) -> (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0)
c  in CNF:
c     b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_2
c     b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_1
c     b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨  b^{2, 551}_0
c  in DIMACS:
 6296 -6297  6298  1100 -6299 0
 6296 -6297  6298  1100 -6300 0
 6296 -6297  6298  1100  6301 0

c  1-1 --> 0
c    (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0 ∧ -p_1100) -> (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧ -b^{2, 551}_0)
c  in CNF:
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_2
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_1
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_0
c  in DIMACS:
 6296  6297 -6298  1100 -6299 0
 6296  6297 -6298  1100 -6300 0
 6296  6297 -6298  1100 -6301 0

c  0-1 --> -1
c    (-b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧ -p_1100) -> ( b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0)
c  in CNF:
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨  b^{2, 551}_2
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_1
c     b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨  b^{2, 551}_0
c  in DIMACS:
 6296  6297  6298  1100  6299 0
 6296  6297  6298  1100 -6300 0
 6296  6297  6298  1100  6301 0

c  -1-1 --> -2
c    ( b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧  b^{2, 550}_0 ∧ -p_1100) -> ( b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0)
c  in CNF:
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨  b^{2, 551}_2
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨  b^{2, 551}_1
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨  p_1100 ∨ -b^{2, 551}_0
c  in DIMACS:
-6296  6297 -6298  1100  6299 0
-6296  6297 -6298  1100  6300 0
-6296  6297 -6298  1100 -6301 0

c  -2-1 --> break 
c    ( b^{2, 550}_2 ∧  b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨  b^{2, 550}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-6296 -6297  6298  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 550}_2 ∧ -b^{2, 550}_1 ∧ -b^{2, 550}_0 ∧ true) 
c  in CNF:
c    -b^{2, 550}_2 ∨  b^{2, 550}_1 ∨  b^{2, 550}_0 ∨ false 
c  in DIMACS:
-6296  6297  6298  0

c  3 does not represent an automaton state.
c    -(-b^{2, 550}_2 ∧  b^{2, 550}_1 ∧  b^{2, 550}_0 ∧ true) 
c  in CNF:
c     b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ false 
c  in DIMACS:
 6296 -6297 -6298  0
c  -3 does not represent an automaton state.
c    -( b^{2, 550}_2 ∧  b^{2, 550}_1 ∧  b^{2, 550}_0 ∧ true) 
c  in CNF:
c    -b^{2, 550}_2 ∨ -b^{2, 550}_1 ∨ -b^{2, 550}_0 ∨ false 
c  in DIMACS:
-6296 -6297 -6298  0

c i = 551
c  -2+1 --> -1
c    ( b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧  p_1102) -> ( b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0)
c  in CNF:
c    -b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨  b^{2, 552}_2
c    -b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_1
c    -b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨  b^{2, 552}_0
c  in DIMACS:
-6299 -6300  6301 -1102  6302 0
-6299 -6300  6301 -1102 -6303 0
-6299 -6300  6301 -1102  6304 0

c  -1+1 --> 0
c    ( b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0 ∧  p_1102) -> (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧ -b^{2, 552}_0)
c  in CNF:
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_2
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_1
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_0
c  in DIMACS:
-6299  6300 -6301 -1102 -6302 0
-6299  6300 -6301 -1102 -6303 0
-6299  6300 -6301 -1102 -6304 0

c  0+1 --> 1
c    (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧  p_1102) -> (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0)
c  in CNF:
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_2
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_1
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨  b^{2, 552}_0
c  in DIMACS:
 6299  6300  6301 -1102 -6302 0
 6299  6300  6301 -1102 -6303 0
 6299  6300  6301 -1102  6304 0

c  1+1 --> 2
c    (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0 ∧  p_1102) -> (-b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0)
c  in CNF:
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_2
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨  b^{2, 552}_1
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ -p_1102 ∨ -b^{2, 552}_0
c  in DIMACS:
 6299  6300 -6301 -1102 -6302 0
 6299  6300 -6301 -1102  6303 0
 6299  6300 -6301 -1102 -6304 0

c  2+1 --> break 
c    (-b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 6299 -6300  6301 -1102 1162 0


c  2-1 --> 1
c    (-b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧ -p_1102) -> (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0)
c  in CNF:
c     b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_2
c     b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_1
c     b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨  b^{2, 552}_0
c  in DIMACS:
 6299 -6300  6301  1102 -6302 0
 6299 -6300  6301  1102 -6303 0
 6299 -6300  6301  1102  6304 0

c  1-1 --> 0
c    (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0 ∧ -p_1102) -> (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧ -b^{2, 552}_0)
c  in CNF:
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_2
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_1
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_0
c  in DIMACS:
 6299  6300 -6301  1102 -6302 0
 6299  6300 -6301  1102 -6303 0
 6299  6300 -6301  1102 -6304 0

c  0-1 --> -1
c    (-b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧ -p_1102) -> ( b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0)
c  in CNF:
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨  b^{2, 552}_2
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_1
c     b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨  b^{2, 552}_0
c  in DIMACS:
 6299  6300  6301  1102  6302 0
 6299  6300  6301  1102 -6303 0
 6299  6300  6301  1102  6304 0

c  -1-1 --> -2
c    ( b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧  b^{2, 551}_0 ∧ -p_1102) -> ( b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0)
c  in CNF:
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨  b^{2, 552}_2
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨  b^{2, 552}_1
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨  p_1102 ∨ -b^{2, 552}_0
c  in DIMACS:
-6299  6300 -6301  1102  6302 0
-6299  6300 -6301  1102  6303 0
-6299  6300 -6301  1102 -6304 0

c  -2-1 --> break 
c    ( b^{2, 551}_2 ∧  b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨  b^{2, 551}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-6299 -6300  6301  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 551}_2 ∧ -b^{2, 551}_1 ∧ -b^{2, 551}_0 ∧ true) 
c  in CNF:
c    -b^{2, 551}_2 ∨  b^{2, 551}_1 ∨  b^{2, 551}_0 ∨ false 
c  in DIMACS:
-6299  6300  6301  0

c  3 does not represent an automaton state.
c    -(-b^{2, 551}_2 ∧  b^{2, 551}_1 ∧  b^{2, 551}_0 ∧ true) 
c  in CNF:
c     b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ false 
c  in DIMACS:
 6299 -6300 -6301  0
c  -3 does not represent an automaton state.
c    -( b^{2, 551}_2 ∧  b^{2, 551}_1 ∧  b^{2, 551}_0 ∧ true) 
c  in CNF:
c    -b^{2, 551}_2 ∨ -b^{2, 551}_1 ∨ -b^{2, 551}_0 ∨ false 
c  in DIMACS:
-6299 -6300 -6301  0

c i = 552
c  -2+1 --> -1
c    ( b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧  p_1104) -> ( b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0)
c  in CNF:
c    -b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨  b^{2, 553}_2
c    -b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_1
c    -b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨  b^{2, 553}_0
c  in DIMACS:
-6302 -6303  6304 -1104  6305 0
-6302 -6303  6304 -1104 -6306 0
-6302 -6303  6304 -1104  6307 0

c  -1+1 --> 0
c    ( b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0 ∧  p_1104) -> (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧ -b^{2, 553}_0)
c  in CNF:
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_2
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_1
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_0
c  in DIMACS:
-6302  6303 -6304 -1104 -6305 0
-6302  6303 -6304 -1104 -6306 0
-6302  6303 -6304 -1104 -6307 0

c  0+1 --> 1
c    (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧  p_1104) -> (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0)
c  in CNF:
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_2
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_1
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨  b^{2, 553}_0
c  in DIMACS:
 6302  6303  6304 -1104 -6305 0
 6302  6303  6304 -1104 -6306 0
 6302  6303  6304 -1104  6307 0

c  1+1 --> 2
c    (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0 ∧  p_1104) -> (-b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0)
c  in CNF:
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_2
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨  b^{2, 553}_1
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ -p_1104 ∨ -b^{2, 553}_0
c  in DIMACS:
 6302  6303 -6304 -1104 -6305 0
 6302  6303 -6304 -1104  6306 0
 6302  6303 -6304 -1104 -6307 0

c  2+1 --> break 
c    (-b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 6302 -6303  6304 -1104 1162 0


c  2-1 --> 1
c    (-b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧ -p_1104) -> (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0)
c  in CNF:
c     b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_2
c     b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_1
c     b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨  b^{2, 553}_0
c  in DIMACS:
 6302 -6303  6304  1104 -6305 0
 6302 -6303  6304  1104 -6306 0
 6302 -6303  6304  1104  6307 0

c  1-1 --> 0
c    (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0 ∧ -p_1104) -> (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧ -b^{2, 553}_0)
c  in CNF:
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_2
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_1
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_0
c  in DIMACS:
 6302  6303 -6304  1104 -6305 0
 6302  6303 -6304  1104 -6306 0
 6302  6303 -6304  1104 -6307 0

c  0-1 --> -1
c    (-b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧ -p_1104) -> ( b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0)
c  in CNF:
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨  b^{2, 553}_2
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_1
c     b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨  b^{2, 553}_0
c  in DIMACS:
 6302  6303  6304  1104  6305 0
 6302  6303  6304  1104 -6306 0
 6302  6303  6304  1104  6307 0

c  -1-1 --> -2
c    ( b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧  b^{2, 552}_0 ∧ -p_1104) -> ( b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0)
c  in CNF:
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨  b^{2, 553}_2
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨  b^{2, 553}_1
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨  p_1104 ∨ -b^{2, 553}_0
c  in DIMACS:
-6302  6303 -6304  1104  6305 0
-6302  6303 -6304  1104  6306 0
-6302  6303 -6304  1104 -6307 0

c  -2-1 --> break 
c    ( b^{2, 552}_2 ∧  b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨  b^{2, 552}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-6302 -6303  6304  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 552}_2 ∧ -b^{2, 552}_1 ∧ -b^{2, 552}_0 ∧ true) 
c  in CNF:
c    -b^{2, 552}_2 ∨  b^{2, 552}_1 ∨  b^{2, 552}_0 ∨ false 
c  in DIMACS:
-6302  6303  6304  0

c  3 does not represent an automaton state.
c    -(-b^{2, 552}_2 ∧  b^{2, 552}_1 ∧  b^{2, 552}_0 ∧ true) 
c  in CNF:
c     b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ false 
c  in DIMACS:
 6302 -6303 -6304  0
c  -3 does not represent an automaton state.
c    -( b^{2, 552}_2 ∧  b^{2, 552}_1 ∧  b^{2, 552}_0 ∧ true) 
c  in CNF:
c    -b^{2, 552}_2 ∨ -b^{2, 552}_1 ∨ -b^{2, 552}_0 ∨ false 
c  in DIMACS:
-6302 -6303 -6304  0

c i = 553
c  -2+1 --> -1
c    ( b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧  p_1106) -> ( b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0)
c  in CNF:
c    -b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨  b^{2, 554}_2
c    -b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_1
c    -b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨  b^{2, 554}_0
c  in DIMACS:
-6305 -6306  6307 -1106  6308 0
-6305 -6306  6307 -1106 -6309 0
-6305 -6306  6307 -1106  6310 0

c  -1+1 --> 0
c    ( b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0 ∧  p_1106) -> (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧ -b^{2, 554}_0)
c  in CNF:
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_2
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_1
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_0
c  in DIMACS:
-6305  6306 -6307 -1106 -6308 0
-6305  6306 -6307 -1106 -6309 0
-6305  6306 -6307 -1106 -6310 0

c  0+1 --> 1
c    (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧  p_1106) -> (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0)
c  in CNF:
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_2
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_1
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨  b^{2, 554}_0
c  in DIMACS:
 6305  6306  6307 -1106 -6308 0
 6305  6306  6307 -1106 -6309 0
 6305  6306  6307 -1106  6310 0

c  1+1 --> 2
c    (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0 ∧  p_1106) -> (-b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0)
c  in CNF:
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_2
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨  b^{2, 554}_1
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ -p_1106 ∨ -b^{2, 554}_0
c  in DIMACS:
 6305  6306 -6307 -1106 -6308 0
 6305  6306 -6307 -1106  6309 0
 6305  6306 -6307 -1106 -6310 0

c  2+1 --> break 
c    (-b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 6305 -6306  6307 -1106 1162 0


c  2-1 --> 1
c    (-b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧ -p_1106) -> (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0)
c  in CNF:
c     b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_2
c     b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_1
c     b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨  b^{2, 554}_0
c  in DIMACS:
 6305 -6306  6307  1106 -6308 0
 6305 -6306  6307  1106 -6309 0
 6305 -6306  6307  1106  6310 0

c  1-1 --> 0
c    (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0 ∧ -p_1106) -> (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧ -b^{2, 554}_0)
c  in CNF:
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_2
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_1
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_0
c  in DIMACS:
 6305  6306 -6307  1106 -6308 0
 6305  6306 -6307  1106 -6309 0
 6305  6306 -6307  1106 -6310 0

c  0-1 --> -1
c    (-b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧ -p_1106) -> ( b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0)
c  in CNF:
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨  b^{2, 554}_2
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_1
c     b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨  b^{2, 554}_0
c  in DIMACS:
 6305  6306  6307  1106  6308 0
 6305  6306  6307  1106 -6309 0
 6305  6306  6307  1106  6310 0

c  -1-1 --> -2
c    ( b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧  b^{2, 553}_0 ∧ -p_1106) -> ( b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0)
c  in CNF:
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨  b^{2, 554}_2
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨  b^{2, 554}_1
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨  p_1106 ∨ -b^{2, 554}_0
c  in DIMACS:
-6305  6306 -6307  1106  6308 0
-6305  6306 -6307  1106  6309 0
-6305  6306 -6307  1106 -6310 0

c  -2-1 --> break 
c    ( b^{2, 553}_2 ∧  b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨  b^{2, 553}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-6305 -6306  6307  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 553}_2 ∧ -b^{2, 553}_1 ∧ -b^{2, 553}_0 ∧ true) 
c  in CNF:
c    -b^{2, 553}_2 ∨  b^{2, 553}_1 ∨  b^{2, 553}_0 ∨ false 
c  in DIMACS:
-6305  6306  6307  0

c  3 does not represent an automaton state.
c    -(-b^{2, 553}_2 ∧  b^{2, 553}_1 ∧  b^{2, 553}_0 ∧ true) 
c  in CNF:
c     b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ false 
c  in DIMACS:
 6305 -6306 -6307  0
c  -3 does not represent an automaton state.
c    -( b^{2, 553}_2 ∧  b^{2, 553}_1 ∧  b^{2, 553}_0 ∧ true) 
c  in CNF:
c    -b^{2, 553}_2 ∨ -b^{2, 553}_1 ∨ -b^{2, 553}_0 ∨ false 
c  in DIMACS:
-6305 -6306 -6307  0

c i = 554
c  -2+1 --> -1
c    ( b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧  p_1108) -> ( b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0)
c  in CNF:
c    -b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨  b^{2, 555}_2
c    -b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_1
c    -b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨  b^{2, 555}_0
c  in DIMACS:
-6308 -6309  6310 -1108  6311 0
-6308 -6309  6310 -1108 -6312 0
-6308 -6309  6310 -1108  6313 0

c  -1+1 --> 0
c    ( b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0 ∧  p_1108) -> (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧ -b^{2, 555}_0)
c  in CNF:
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_2
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_1
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_0
c  in DIMACS:
-6308  6309 -6310 -1108 -6311 0
-6308  6309 -6310 -1108 -6312 0
-6308  6309 -6310 -1108 -6313 0

c  0+1 --> 1
c    (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧  p_1108) -> (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0)
c  in CNF:
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_2
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_1
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨  b^{2, 555}_0
c  in DIMACS:
 6308  6309  6310 -1108 -6311 0
 6308  6309  6310 -1108 -6312 0
 6308  6309  6310 -1108  6313 0

c  1+1 --> 2
c    (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0 ∧  p_1108) -> (-b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0)
c  in CNF:
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_2
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨  b^{2, 555}_1
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ -p_1108 ∨ -b^{2, 555}_0
c  in DIMACS:
 6308  6309 -6310 -1108 -6311 0
 6308  6309 -6310 -1108  6312 0
 6308  6309 -6310 -1108 -6313 0

c  2+1 --> break 
c    (-b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧  p_1108) -> break
c  in CNF:
c     b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ -p_1108 ∨ break
c  in DIMACS:
 6308 -6309  6310 -1108 1162 0


c  2-1 --> 1
c    (-b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧ -p_1108) -> (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0)
c  in CNF:
c     b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_2
c     b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_1
c     b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨  b^{2, 555}_0
c  in DIMACS:
 6308 -6309  6310  1108 -6311 0
 6308 -6309  6310  1108 -6312 0
 6308 -6309  6310  1108  6313 0

c  1-1 --> 0
c    (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0 ∧ -p_1108) -> (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧ -b^{2, 555}_0)
c  in CNF:
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_2
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_1
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_0
c  in DIMACS:
 6308  6309 -6310  1108 -6311 0
 6308  6309 -6310  1108 -6312 0
 6308  6309 -6310  1108 -6313 0

c  0-1 --> -1
c    (-b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧ -p_1108) -> ( b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0)
c  in CNF:
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨  b^{2, 555}_2
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_1
c     b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨  b^{2, 555}_0
c  in DIMACS:
 6308  6309  6310  1108  6311 0
 6308  6309  6310  1108 -6312 0
 6308  6309  6310  1108  6313 0

c  -1-1 --> -2
c    ( b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧  b^{2, 554}_0 ∧ -p_1108) -> ( b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0)
c  in CNF:
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨  b^{2, 555}_2
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨  b^{2, 555}_1
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨  p_1108 ∨ -b^{2, 555}_0
c  in DIMACS:
-6308  6309 -6310  1108  6311 0
-6308  6309 -6310  1108  6312 0
-6308  6309 -6310  1108 -6313 0

c  -2-1 --> break 
c    ( b^{2, 554}_2 ∧  b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧ -p_1108) -> break
c  in CNF:
c    -b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨  b^{2, 554}_0 ∨  p_1108 ∨ break
c  in DIMACS:
-6308 -6309  6310  1108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 554}_2 ∧ -b^{2, 554}_1 ∧ -b^{2, 554}_0 ∧ true) 
c  in CNF:
c    -b^{2, 554}_2 ∨  b^{2, 554}_1 ∨  b^{2, 554}_0 ∨ false 
c  in DIMACS:
-6308  6309  6310  0

c  3 does not represent an automaton state.
c    -(-b^{2, 554}_2 ∧  b^{2, 554}_1 ∧  b^{2, 554}_0 ∧ true) 
c  in CNF:
c     b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ false 
c  in DIMACS:
 6308 -6309 -6310  0
c  -3 does not represent an automaton state.
c    -( b^{2, 554}_2 ∧  b^{2, 554}_1 ∧  b^{2, 554}_0 ∧ true) 
c  in CNF:
c    -b^{2, 554}_2 ∨ -b^{2, 554}_1 ∨ -b^{2, 554}_0 ∨ false 
c  in DIMACS:
-6308 -6309 -6310  0

c i = 555
c  -2+1 --> -1
c    ( b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧  p_1110) -> ( b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0)
c  in CNF:
c    -b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨  b^{2, 556}_2
c    -b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_1
c    -b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨  b^{2, 556}_0
c  in DIMACS:
-6311 -6312  6313 -1110  6314 0
-6311 -6312  6313 -1110 -6315 0
-6311 -6312  6313 -1110  6316 0

c  -1+1 --> 0
c    ( b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0 ∧  p_1110) -> (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧ -b^{2, 556}_0)
c  in CNF:
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_2
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_1
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_0
c  in DIMACS:
-6311  6312 -6313 -1110 -6314 0
-6311  6312 -6313 -1110 -6315 0
-6311  6312 -6313 -1110 -6316 0

c  0+1 --> 1
c    (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧  p_1110) -> (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0)
c  in CNF:
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_2
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_1
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨  b^{2, 556}_0
c  in DIMACS:
 6311  6312  6313 -1110 -6314 0
 6311  6312  6313 -1110 -6315 0
 6311  6312  6313 -1110  6316 0

c  1+1 --> 2
c    (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0 ∧  p_1110) -> (-b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0)
c  in CNF:
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_2
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨  b^{2, 556}_1
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ -p_1110 ∨ -b^{2, 556}_0
c  in DIMACS:
 6311  6312 -6313 -1110 -6314 0
 6311  6312 -6313 -1110  6315 0
 6311  6312 -6313 -1110 -6316 0

c  2+1 --> break 
c    (-b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 6311 -6312  6313 -1110 1162 0


c  2-1 --> 1
c    (-b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧ -p_1110) -> (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0)
c  in CNF:
c     b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_2
c     b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_1
c     b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨  b^{2, 556}_0
c  in DIMACS:
 6311 -6312  6313  1110 -6314 0
 6311 -6312  6313  1110 -6315 0
 6311 -6312  6313  1110  6316 0

c  1-1 --> 0
c    (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0 ∧ -p_1110) -> (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧ -b^{2, 556}_0)
c  in CNF:
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_2
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_1
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_0
c  in DIMACS:
 6311  6312 -6313  1110 -6314 0
 6311  6312 -6313  1110 -6315 0
 6311  6312 -6313  1110 -6316 0

c  0-1 --> -1
c    (-b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧ -p_1110) -> ( b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0)
c  in CNF:
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨  b^{2, 556}_2
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_1
c     b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨  b^{2, 556}_0
c  in DIMACS:
 6311  6312  6313  1110  6314 0
 6311  6312  6313  1110 -6315 0
 6311  6312  6313  1110  6316 0

c  -1-1 --> -2
c    ( b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧  b^{2, 555}_0 ∧ -p_1110) -> ( b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0)
c  in CNF:
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨  b^{2, 556}_2
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨  b^{2, 556}_1
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨  p_1110 ∨ -b^{2, 556}_0
c  in DIMACS:
-6311  6312 -6313  1110  6314 0
-6311  6312 -6313  1110  6315 0
-6311  6312 -6313  1110 -6316 0

c  -2-1 --> break 
c    ( b^{2, 555}_2 ∧  b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨  b^{2, 555}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-6311 -6312  6313  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 555}_2 ∧ -b^{2, 555}_1 ∧ -b^{2, 555}_0 ∧ true) 
c  in CNF:
c    -b^{2, 555}_2 ∨  b^{2, 555}_1 ∨  b^{2, 555}_0 ∨ false 
c  in DIMACS:
-6311  6312  6313  0

c  3 does not represent an automaton state.
c    -(-b^{2, 555}_2 ∧  b^{2, 555}_1 ∧  b^{2, 555}_0 ∧ true) 
c  in CNF:
c     b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ false 
c  in DIMACS:
 6311 -6312 -6313  0
c  -3 does not represent an automaton state.
c    -( b^{2, 555}_2 ∧  b^{2, 555}_1 ∧  b^{2, 555}_0 ∧ true) 
c  in CNF:
c    -b^{2, 555}_2 ∨ -b^{2, 555}_1 ∨ -b^{2, 555}_0 ∨ false 
c  in DIMACS:
-6311 -6312 -6313  0

c i = 556
c  -2+1 --> -1
c    ( b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧  p_1112) -> ( b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0)
c  in CNF:
c    -b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨  b^{2, 557}_2
c    -b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_1
c    -b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨  b^{2, 557}_0
c  in DIMACS:
-6314 -6315  6316 -1112  6317 0
-6314 -6315  6316 -1112 -6318 0
-6314 -6315  6316 -1112  6319 0

c  -1+1 --> 0
c    ( b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0 ∧  p_1112) -> (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧ -b^{2, 557}_0)
c  in CNF:
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_2
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_1
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_0
c  in DIMACS:
-6314  6315 -6316 -1112 -6317 0
-6314  6315 -6316 -1112 -6318 0
-6314  6315 -6316 -1112 -6319 0

c  0+1 --> 1
c    (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧  p_1112) -> (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0)
c  in CNF:
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_2
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_1
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨  b^{2, 557}_0
c  in DIMACS:
 6314  6315  6316 -1112 -6317 0
 6314  6315  6316 -1112 -6318 0
 6314  6315  6316 -1112  6319 0

c  1+1 --> 2
c    (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0 ∧  p_1112) -> (-b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0)
c  in CNF:
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_2
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨  b^{2, 557}_1
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ -p_1112 ∨ -b^{2, 557}_0
c  in DIMACS:
 6314  6315 -6316 -1112 -6317 0
 6314  6315 -6316 -1112  6318 0
 6314  6315 -6316 -1112 -6319 0

c  2+1 --> break 
c    (-b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 6314 -6315  6316 -1112 1162 0


c  2-1 --> 1
c    (-b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧ -p_1112) -> (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0)
c  in CNF:
c     b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_2
c     b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_1
c     b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨  b^{2, 557}_0
c  in DIMACS:
 6314 -6315  6316  1112 -6317 0
 6314 -6315  6316  1112 -6318 0
 6314 -6315  6316  1112  6319 0

c  1-1 --> 0
c    (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0 ∧ -p_1112) -> (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧ -b^{2, 557}_0)
c  in CNF:
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_2
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_1
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_0
c  in DIMACS:
 6314  6315 -6316  1112 -6317 0
 6314  6315 -6316  1112 -6318 0
 6314  6315 -6316  1112 -6319 0

c  0-1 --> -1
c    (-b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧ -p_1112) -> ( b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0)
c  in CNF:
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨  b^{2, 557}_2
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_1
c     b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨  b^{2, 557}_0
c  in DIMACS:
 6314  6315  6316  1112  6317 0
 6314  6315  6316  1112 -6318 0
 6314  6315  6316  1112  6319 0

c  -1-1 --> -2
c    ( b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧  b^{2, 556}_0 ∧ -p_1112) -> ( b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0)
c  in CNF:
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨  b^{2, 557}_2
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨  b^{2, 557}_1
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨  p_1112 ∨ -b^{2, 557}_0
c  in DIMACS:
-6314  6315 -6316  1112  6317 0
-6314  6315 -6316  1112  6318 0
-6314  6315 -6316  1112 -6319 0

c  -2-1 --> break 
c    ( b^{2, 556}_2 ∧  b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨  b^{2, 556}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-6314 -6315  6316  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 556}_2 ∧ -b^{2, 556}_1 ∧ -b^{2, 556}_0 ∧ true) 
c  in CNF:
c    -b^{2, 556}_2 ∨  b^{2, 556}_1 ∨  b^{2, 556}_0 ∨ false 
c  in DIMACS:
-6314  6315  6316  0

c  3 does not represent an automaton state.
c    -(-b^{2, 556}_2 ∧  b^{2, 556}_1 ∧  b^{2, 556}_0 ∧ true) 
c  in CNF:
c     b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ false 
c  in DIMACS:
 6314 -6315 -6316  0
c  -3 does not represent an automaton state.
c    -( b^{2, 556}_2 ∧  b^{2, 556}_1 ∧  b^{2, 556}_0 ∧ true) 
c  in CNF:
c    -b^{2, 556}_2 ∨ -b^{2, 556}_1 ∨ -b^{2, 556}_0 ∨ false 
c  in DIMACS:
-6314 -6315 -6316  0

c i = 557
c  -2+1 --> -1
c    ( b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧  p_1114) -> ( b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0)
c  in CNF:
c    -b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨  b^{2, 558}_2
c    -b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_1
c    -b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨  b^{2, 558}_0
c  in DIMACS:
-6317 -6318  6319 -1114  6320 0
-6317 -6318  6319 -1114 -6321 0
-6317 -6318  6319 -1114  6322 0

c  -1+1 --> 0
c    ( b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0 ∧  p_1114) -> (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧ -b^{2, 558}_0)
c  in CNF:
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_2
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_1
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_0
c  in DIMACS:
-6317  6318 -6319 -1114 -6320 0
-6317  6318 -6319 -1114 -6321 0
-6317  6318 -6319 -1114 -6322 0

c  0+1 --> 1
c    (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧  p_1114) -> (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0)
c  in CNF:
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_2
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_1
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨  b^{2, 558}_0
c  in DIMACS:
 6317  6318  6319 -1114 -6320 0
 6317  6318  6319 -1114 -6321 0
 6317  6318  6319 -1114  6322 0

c  1+1 --> 2
c    (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0 ∧  p_1114) -> (-b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0)
c  in CNF:
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_2
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨  b^{2, 558}_1
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ -p_1114 ∨ -b^{2, 558}_0
c  in DIMACS:
 6317  6318 -6319 -1114 -6320 0
 6317  6318 -6319 -1114  6321 0
 6317  6318 -6319 -1114 -6322 0

c  2+1 --> break 
c    (-b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧  p_1114) -> break
c  in CNF:
c     b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ -p_1114 ∨ break
c  in DIMACS:
 6317 -6318  6319 -1114 1162 0


c  2-1 --> 1
c    (-b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧ -p_1114) -> (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0)
c  in CNF:
c     b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_2
c     b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_1
c     b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨  b^{2, 558}_0
c  in DIMACS:
 6317 -6318  6319  1114 -6320 0
 6317 -6318  6319  1114 -6321 0
 6317 -6318  6319  1114  6322 0

c  1-1 --> 0
c    (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0 ∧ -p_1114) -> (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧ -b^{2, 558}_0)
c  in CNF:
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_2
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_1
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_0
c  in DIMACS:
 6317  6318 -6319  1114 -6320 0
 6317  6318 -6319  1114 -6321 0
 6317  6318 -6319  1114 -6322 0

c  0-1 --> -1
c    (-b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧ -p_1114) -> ( b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0)
c  in CNF:
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨  b^{2, 558}_2
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_1
c     b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨  b^{2, 558}_0
c  in DIMACS:
 6317  6318  6319  1114  6320 0
 6317  6318  6319  1114 -6321 0
 6317  6318  6319  1114  6322 0

c  -1-1 --> -2
c    ( b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧  b^{2, 557}_0 ∧ -p_1114) -> ( b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0)
c  in CNF:
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨  b^{2, 558}_2
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨  b^{2, 558}_1
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨  p_1114 ∨ -b^{2, 558}_0
c  in DIMACS:
-6317  6318 -6319  1114  6320 0
-6317  6318 -6319  1114  6321 0
-6317  6318 -6319  1114 -6322 0

c  -2-1 --> break 
c    ( b^{2, 557}_2 ∧  b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧ -p_1114) -> break
c  in CNF:
c    -b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨  b^{2, 557}_0 ∨  p_1114 ∨ break
c  in DIMACS:
-6317 -6318  6319  1114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 557}_2 ∧ -b^{2, 557}_1 ∧ -b^{2, 557}_0 ∧ true) 
c  in CNF:
c    -b^{2, 557}_2 ∨  b^{2, 557}_1 ∨  b^{2, 557}_0 ∨ false 
c  in DIMACS:
-6317  6318  6319  0

c  3 does not represent an automaton state.
c    -(-b^{2, 557}_2 ∧  b^{2, 557}_1 ∧  b^{2, 557}_0 ∧ true) 
c  in CNF:
c     b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ false 
c  in DIMACS:
 6317 -6318 -6319  0
c  -3 does not represent an automaton state.
c    -( b^{2, 557}_2 ∧  b^{2, 557}_1 ∧  b^{2, 557}_0 ∧ true) 
c  in CNF:
c    -b^{2, 557}_2 ∨ -b^{2, 557}_1 ∨ -b^{2, 557}_0 ∨ false 
c  in DIMACS:
-6317 -6318 -6319  0

c i = 558
c  -2+1 --> -1
c    ( b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧  p_1116) -> ( b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0)
c  in CNF:
c    -b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨  b^{2, 559}_2
c    -b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_1
c    -b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨  b^{2, 559}_0
c  in DIMACS:
-6320 -6321  6322 -1116  6323 0
-6320 -6321  6322 -1116 -6324 0
-6320 -6321  6322 -1116  6325 0

c  -1+1 --> 0
c    ( b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0 ∧  p_1116) -> (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧ -b^{2, 559}_0)
c  in CNF:
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_2
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_1
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_0
c  in DIMACS:
-6320  6321 -6322 -1116 -6323 0
-6320  6321 -6322 -1116 -6324 0
-6320  6321 -6322 -1116 -6325 0

c  0+1 --> 1
c    (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧  p_1116) -> (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0)
c  in CNF:
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_2
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_1
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨  b^{2, 559}_0
c  in DIMACS:
 6320  6321  6322 -1116 -6323 0
 6320  6321  6322 -1116 -6324 0
 6320  6321  6322 -1116  6325 0

c  1+1 --> 2
c    (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0 ∧  p_1116) -> (-b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0)
c  in CNF:
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_2
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨  b^{2, 559}_1
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ -p_1116 ∨ -b^{2, 559}_0
c  in DIMACS:
 6320  6321 -6322 -1116 -6323 0
 6320  6321 -6322 -1116  6324 0
 6320  6321 -6322 -1116 -6325 0

c  2+1 --> break 
c    (-b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 6320 -6321  6322 -1116 1162 0


c  2-1 --> 1
c    (-b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧ -p_1116) -> (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0)
c  in CNF:
c     b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_2
c     b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_1
c     b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨  b^{2, 559}_0
c  in DIMACS:
 6320 -6321  6322  1116 -6323 0
 6320 -6321  6322  1116 -6324 0
 6320 -6321  6322  1116  6325 0

c  1-1 --> 0
c    (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0 ∧ -p_1116) -> (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧ -b^{2, 559}_0)
c  in CNF:
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_2
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_1
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_0
c  in DIMACS:
 6320  6321 -6322  1116 -6323 0
 6320  6321 -6322  1116 -6324 0
 6320  6321 -6322  1116 -6325 0

c  0-1 --> -1
c    (-b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧ -p_1116) -> ( b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0)
c  in CNF:
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨  b^{2, 559}_2
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_1
c     b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨  b^{2, 559}_0
c  in DIMACS:
 6320  6321  6322  1116  6323 0
 6320  6321  6322  1116 -6324 0
 6320  6321  6322  1116  6325 0

c  -1-1 --> -2
c    ( b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧  b^{2, 558}_0 ∧ -p_1116) -> ( b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0)
c  in CNF:
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨  b^{2, 559}_2
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨  b^{2, 559}_1
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨  p_1116 ∨ -b^{2, 559}_0
c  in DIMACS:
-6320  6321 -6322  1116  6323 0
-6320  6321 -6322  1116  6324 0
-6320  6321 -6322  1116 -6325 0

c  -2-1 --> break 
c    ( b^{2, 558}_2 ∧  b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨  b^{2, 558}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-6320 -6321  6322  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 558}_2 ∧ -b^{2, 558}_1 ∧ -b^{2, 558}_0 ∧ true) 
c  in CNF:
c    -b^{2, 558}_2 ∨  b^{2, 558}_1 ∨  b^{2, 558}_0 ∨ false 
c  in DIMACS:
-6320  6321  6322  0

c  3 does not represent an automaton state.
c    -(-b^{2, 558}_2 ∧  b^{2, 558}_1 ∧  b^{2, 558}_0 ∧ true) 
c  in CNF:
c     b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ false 
c  in DIMACS:
 6320 -6321 -6322  0
c  -3 does not represent an automaton state.
c    -( b^{2, 558}_2 ∧  b^{2, 558}_1 ∧  b^{2, 558}_0 ∧ true) 
c  in CNF:
c    -b^{2, 558}_2 ∨ -b^{2, 558}_1 ∨ -b^{2, 558}_0 ∨ false 
c  in DIMACS:
-6320 -6321 -6322  0

c i = 559
c  -2+1 --> -1
c    ( b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧  p_1118) -> ( b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0)
c  in CNF:
c    -b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨  b^{2, 560}_2
c    -b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_1
c    -b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨  b^{2, 560}_0
c  in DIMACS:
-6323 -6324  6325 -1118  6326 0
-6323 -6324  6325 -1118 -6327 0
-6323 -6324  6325 -1118  6328 0

c  -1+1 --> 0
c    ( b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0 ∧  p_1118) -> (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧ -b^{2, 560}_0)
c  in CNF:
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_2
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_1
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_0
c  in DIMACS:
-6323  6324 -6325 -1118 -6326 0
-6323  6324 -6325 -1118 -6327 0
-6323  6324 -6325 -1118 -6328 0

c  0+1 --> 1
c    (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧  p_1118) -> (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0)
c  in CNF:
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_2
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_1
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨  b^{2, 560}_0
c  in DIMACS:
 6323  6324  6325 -1118 -6326 0
 6323  6324  6325 -1118 -6327 0
 6323  6324  6325 -1118  6328 0

c  1+1 --> 2
c    (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0 ∧  p_1118) -> (-b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0)
c  in CNF:
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_2
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨  b^{2, 560}_1
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ -p_1118 ∨ -b^{2, 560}_0
c  in DIMACS:
 6323  6324 -6325 -1118 -6326 0
 6323  6324 -6325 -1118  6327 0
 6323  6324 -6325 -1118 -6328 0

c  2+1 --> break 
c    (-b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 6323 -6324  6325 -1118 1162 0


c  2-1 --> 1
c    (-b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧ -p_1118) -> (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0)
c  in CNF:
c     b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_2
c     b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_1
c     b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨  b^{2, 560}_0
c  in DIMACS:
 6323 -6324  6325  1118 -6326 0
 6323 -6324  6325  1118 -6327 0
 6323 -6324  6325  1118  6328 0

c  1-1 --> 0
c    (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0 ∧ -p_1118) -> (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧ -b^{2, 560}_0)
c  in CNF:
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_2
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_1
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_0
c  in DIMACS:
 6323  6324 -6325  1118 -6326 0
 6323  6324 -6325  1118 -6327 0
 6323  6324 -6325  1118 -6328 0

c  0-1 --> -1
c    (-b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧ -p_1118) -> ( b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0)
c  in CNF:
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨  b^{2, 560}_2
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_1
c     b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨  b^{2, 560}_0
c  in DIMACS:
 6323  6324  6325  1118  6326 0
 6323  6324  6325  1118 -6327 0
 6323  6324  6325  1118  6328 0

c  -1-1 --> -2
c    ( b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧  b^{2, 559}_0 ∧ -p_1118) -> ( b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0)
c  in CNF:
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨  b^{2, 560}_2
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨  b^{2, 560}_1
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨  p_1118 ∨ -b^{2, 560}_0
c  in DIMACS:
-6323  6324 -6325  1118  6326 0
-6323  6324 -6325  1118  6327 0
-6323  6324 -6325  1118 -6328 0

c  -2-1 --> break 
c    ( b^{2, 559}_2 ∧  b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨  b^{2, 559}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-6323 -6324  6325  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 559}_2 ∧ -b^{2, 559}_1 ∧ -b^{2, 559}_0 ∧ true) 
c  in CNF:
c    -b^{2, 559}_2 ∨  b^{2, 559}_1 ∨  b^{2, 559}_0 ∨ false 
c  in DIMACS:
-6323  6324  6325  0

c  3 does not represent an automaton state.
c    -(-b^{2, 559}_2 ∧  b^{2, 559}_1 ∧  b^{2, 559}_0 ∧ true) 
c  in CNF:
c     b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ false 
c  in DIMACS:
 6323 -6324 -6325  0
c  -3 does not represent an automaton state.
c    -( b^{2, 559}_2 ∧  b^{2, 559}_1 ∧  b^{2, 559}_0 ∧ true) 
c  in CNF:
c    -b^{2, 559}_2 ∨ -b^{2, 559}_1 ∨ -b^{2, 559}_0 ∨ false 
c  in DIMACS:
-6323 -6324 -6325  0

c i = 560
c  -2+1 --> -1
c    ( b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧  p_1120) -> ( b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0)
c  in CNF:
c    -b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨  b^{2, 561}_2
c    -b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_1
c    -b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨  b^{2, 561}_0
c  in DIMACS:
-6326 -6327  6328 -1120  6329 0
-6326 -6327  6328 -1120 -6330 0
-6326 -6327  6328 -1120  6331 0

c  -1+1 --> 0
c    ( b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0 ∧  p_1120) -> (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧ -b^{2, 561}_0)
c  in CNF:
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_2
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_1
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_0
c  in DIMACS:
-6326  6327 -6328 -1120 -6329 0
-6326  6327 -6328 -1120 -6330 0
-6326  6327 -6328 -1120 -6331 0

c  0+1 --> 1
c    (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧  p_1120) -> (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0)
c  in CNF:
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_2
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_1
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨  b^{2, 561}_0
c  in DIMACS:
 6326  6327  6328 -1120 -6329 0
 6326  6327  6328 -1120 -6330 0
 6326  6327  6328 -1120  6331 0

c  1+1 --> 2
c    (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0 ∧  p_1120) -> (-b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0)
c  in CNF:
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_2
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨  b^{2, 561}_1
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ -p_1120 ∨ -b^{2, 561}_0
c  in DIMACS:
 6326  6327 -6328 -1120 -6329 0
 6326  6327 -6328 -1120  6330 0
 6326  6327 -6328 -1120 -6331 0

c  2+1 --> break 
c    (-b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 6326 -6327  6328 -1120 1162 0


c  2-1 --> 1
c    (-b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧ -p_1120) -> (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0)
c  in CNF:
c     b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_2
c     b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_1
c     b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨  b^{2, 561}_0
c  in DIMACS:
 6326 -6327  6328  1120 -6329 0
 6326 -6327  6328  1120 -6330 0
 6326 -6327  6328  1120  6331 0

c  1-1 --> 0
c    (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0 ∧ -p_1120) -> (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧ -b^{2, 561}_0)
c  in CNF:
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_2
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_1
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_0
c  in DIMACS:
 6326  6327 -6328  1120 -6329 0
 6326  6327 -6328  1120 -6330 0
 6326  6327 -6328  1120 -6331 0

c  0-1 --> -1
c    (-b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧ -p_1120) -> ( b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0)
c  in CNF:
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨  b^{2, 561}_2
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_1
c     b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨  b^{2, 561}_0
c  in DIMACS:
 6326  6327  6328  1120  6329 0
 6326  6327  6328  1120 -6330 0
 6326  6327  6328  1120  6331 0

c  -1-1 --> -2
c    ( b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧  b^{2, 560}_0 ∧ -p_1120) -> ( b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0)
c  in CNF:
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨  b^{2, 561}_2
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨  b^{2, 561}_1
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨  p_1120 ∨ -b^{2, 561}_0
c  in DIMACS:
-6326  6327 -6328  1120  6329 0
-6326  6327 -6328  1120  6330 0
-6326  6327 -6328  1120 -6331 0

c  -2-1 --> break 
c    ( b^{2, 560}_2 ∧  b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨  b^{2, 560}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-6326 -6327  6328  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 560}_2 ∧ -b^{2, 560}_1 ∧ -b^{2, 560}_0 ∧ true) 
c  in CNF:
c    -b^{2, 560}_2 ∨  b^{2, 560}_1 ∨  b^{2, 560}_0 ∨ false 
c  in DIMACS:
-6326  6327  6328  0

c  3 does not represent an automaton state.
c    -(-b^{2, 560}_2 ∧  b^{2, 560}_1 ∧  b^{2, 560}_0 ∧ true) 
c  in CNF:
c     b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ false 
c  in DIMACS:
 6326 -6327 -6328  0
c  -3 does not represent an automaton state.
c    -( b^{2, 560}_2 ∧  b^{2, 560}_1 ∧  b^{2, 560}_0 ∧ true) 
c  in CNF:
c    -b^{2, 560}_2 ∨ -b^{2, 560}_1 ∨ -b^{2, 560}_0 ∨ false 
c  in DIMACS:
-6326 -6327 -6328  0

c i = 561
c  -2+1 --> -1
c    ( b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧  p_1122) -> ( b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0)
c  in CNF:
c    -b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨  b^{2, 562}_2
c    -b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_1
c    -b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨  b^{2, 562}_0
c  in DIMACS:
-6329 -6330  6331 -1122  6332 0
-6329 -6330  6331 -1122 -6333 0
-6329 -6330  6331 -1122  6334 0

c  -1+1 --> 0
c    ( b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0 ∧  p_1122) -> (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧ -b^{2, 562}_0)
c  in CNF:
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_2
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_1
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_0
c  in DIMACS:
-6329  6330 -6331 -1122 -6332 0
-6329  6330 -6331 -1122 -6333 0
-6329  6330 -6331 -1122 -6334 0

c  0+1 --> 1
c    (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧  p_1122) -> (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0)
c  in CNF:
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_2
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_1
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨  b^{2, 562}_0
c  in DIMACS:
 6329  6330  6331 -1122 -6332 0
 6329  6330  6331 -1122 -6333 0
 6329  6330  6331 -1122  6334 0

c  1+1 --> 2
c    (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0 ∧  p_1122) -> (-b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0)
c  in CNF:
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_2
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨  b^{2, 562}_1
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ -p_1122 ∨ -b^{2, 562}_0
c  in DIMACS:
 6329  6330 -6331 -1122 -6332 0
 6329  6330 -6331 -1122  6333 0
 6329  6330 -6331 -1122 -6334 0

c  2+1 --> break 
c    (-b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 6329 -6330  6331 -1122 1162 0


c  2-1 --> 1
c    (-b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧ -p_1122) -> (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0)
c  in CNF:
c     b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_2
c     b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_1
c     b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨  b^{2, 562}_0
c  in DIMACS:
 6329 -6330  6331  1122 -6332 0
 6329 -6330  6331  1122 -6333 0
 6329 -6330  6331  1122  6334 0

c  1-1 --> 0
c    (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0 ∧ -p_1122) -> (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧ -b^{2, 562}_0)
c  in CNF:
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_2
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_1
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_0
c  in DIMACS:
 6329  6330 -6331  1122 -6332 0
 6329  6330 -6331  1122 -6333 0
 6329  6330 -6331  1122 -6334 0

c  0-1 --> -1
c    (-b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧ -p_1122) -> ( b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0)
c  in CNF:
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨  b^{2, 562}_2
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_1
c     b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨  b^{2, 562}_0
c  in DIMACS:
 6329  6330  6331  1122  6332 0
 6329  6330  6331  1122 -6333 0
 6329  6330  6331  1122  6334 0

c  -1-1 --> -2
c    ( b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧  b^{2, 561}_0 ∧ -p_1122) -> ( b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0)
c  in CNF:
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨  b^{2, 562}_2
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨  b^{2, 562}_1
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨  p_1122 ∨ -b^{2, 562}_0
c  in DIMACS:
-6329  6330 -6331  1122  6332 0
-6329  6330 -6331  1122  6333 0
-6329  6330 -6331  1122 -6334 0

c  -2-1 --> break 
c    ( b^{2, 561}_2 ∧  b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨  b^{2, 561}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-6329 -6330  6331  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 561}_2 ∧ -b^{2, 561}_1 ∧ -b^{2, 561}_0 ∧ true) 
c  in CNF:
c    -b^{2, 561}_2 ∨  b^{2, 561}_1 ∨  b^{2, 561}_0 ∨ false 
c  in DIMACS:
-6329  6330  6331  0

c  3 does not represent an automaton state.
c    -(-b^{2, 561}_2 ∧  b^{2, 561}_1 ∧  b^{2, 561}_0 ∧ true) 
c  in CNF:
c     b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ false 
c  in DIMACS:
 6329 -6330 -6331  0
c  -3 does not represent an automaton state.
c    -( b^{2, 561}_2 ∧  b^{2, 561}_1 ∧  b^{2, 561}_0 ∧ true) 
c  in CNF:
c    -b^{2, 561}_2 ∨ -b^{2, 561}_1 ∨ -b^{2, 561}_0 ∨ false 
c  in DIMACS:
-6329 -6330 -6331  0

c i = 562
c  -2+1 --> -1
c    ( b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧  p_1124) -> ( b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0)
c  in CNF:
c    -b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨  b^{2, 563}_2
c    -b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_1
c    -b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨  b^{2, 563}_0
c  in DIMACS:
-6332 -6333  6334 -1124  6335 0
-6332 -6333  6334 -1124 -6336 0
-6332 -6333  6334 -1124  6337 0

c  -1+1 --> 0
c    ( b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0 ∧  p_1124) -> (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧ -b^{2, 563}_0)
c  in CNF:
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_2
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_1
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_0
c  in DIMACS:
-6332  6333 -6334 -1124 -6335 0
-6332  6333 -6334 -1124 -6336 0
-6332  6333 -6334 -1124 -6337 0

c  0+1 --> 1
c    (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧  p_1124) -> (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0)
c  in CNF:
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_2
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_1
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨  b^{2, 563}_0
c  in DIMACS:
 6332  6333  6334 -1124 -6335 0
 6332  6333  6334 -1124 -6336 0
 6332  6333  6334 -1124  6337 0

c  1+1 --> 2
c    (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0 ∧  p_1124) -> (-b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0)
c  in CNF:
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_2
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨  b^{2, 563}_1
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ -p_1124 ∨ -b^{2, 563}_0
c  in DIMACS:
 6332  6333 -6334 -1124 -6335 0
 6332  6333 -6334 -1124  6336 0
 6332  6333 -6334 -1124 -6337 0

c  2+1 --> break 
c    (-b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧  p_1124) -> break
c  in CNF:
c     b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ -p_1124 ∨ break
c  in DIMACS:
 6332 -6333  6334 -1124 1162 0


c  2-1 --> 1
c    (-b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧ -p_1124) -> (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0)
c  in CNF:
c     b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_2
c     b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_1
c     b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨  b^{2, 563}_0
c  in DIMACS:
 6332 -6333  6334  1124 -6335 0
 6332 -6333  6334  1124 -6336 0
 6332 -6333  6334  1124  6337 0

c  1-1 --> 0
c    (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0 ∧ -p_1124) -> (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧ -b^{2, 563}_0)
c  in CNF:
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_2
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_1
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_0
c  in DIMACS:
 6332  6333 -6334  1124 -6335 0
 6332  6333 -6334  1124 -6336 0
 6332  6333 -6334  1124 -6337 0

c  0-1 --> -1
c    (-b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧ -p_1124) -> ( b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0)
c  in CNF:
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨  b^{2, 563}_2
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_1
c     b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨  b^{2, 563}_0
c  in DIMACS:
 6332  6333  6334  1124  6335 0
 6332  6333  6334  1124 -6336 0
 6332  6333  6334  1124  6337 0

c  -1-1 --> -2
c    ( b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧  b^{2, 562}_0 ∧ -p_1124) -> ( b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0)
c  in CNF:
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨  b^{2, 563}_2
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨  b^{2, 563}_1
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨  p_1124 ∨ -b^{2, 563}_0
c  in DIMACS:
-6332  6333 -6334  1124  6335 0
-6332  6333 -6334  1124  6336 0
-6332  6333 -6334  1124 -6337 0

c  -2-1 --> break 
c    ( b^{2, 562}_2 ∧  b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧ -p_1124) -> break
c  in CNF:
c    -b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨  b^{2, 562}_0 ∨  p_1124 ∨ break
c  in DIMACS:
-6332 -6333  6334  1124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 562}_2 ∧ -b^{2, 562}_1 ∧ -b^{2, 562}_0 ∧ true) 
c  in CNF:
c    -b^{2, 562}_2 ∨  b^{2, 562}_1 ∨  b^{2, 562}_0 ∨ false 
c  in DIMACS:
-6332  6333  6334  0

c  3 does not represent an automaton state.
c    -(-b^{2, 562}_2 ∧  b^{2, 562}_1 ∧  b^{2, 562}_0 ∧ true) 
c  in CNF:
c     b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ false 
c  in DIMACS:
 6332 -6333 -6334  0
c  -3 does not represent an automaton state.
c    -( b^{2, 562}_2 ∧  b^{2, 562}_1 ∧  b^{2, 562}_0 ∧ true) 
c  in CNF:
c    -b^{2, 562}_2 ∨ -b^{2, 562}_1 ∨ -b^{2, 562}_0 ∨ false 
c  in DIMACS:
-6332 -6333 -6334  0

c i = 563
c  -2+1 --> -1
c    ( b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧  p_1126) -> ( b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0)
c  in CNF:
c    -b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨  b^{2, 564}_2
c    -b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_1
c    -b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨  b^{2, 564}_0
c  in DIMACS:
-6335 -6336  6337 -1126  6338 0
-6335 -6336  6337 -1126 -6339 0
-6335 -6336  6337 -1126  6340 0

c  -1+1 --> 0
c    ( b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0 ∧  p_1126) -> (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧ -b^{2, 564}_0)
c  in CNF:
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_2
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_1
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_0
c  in DIMACS:
-6335  6336 -6337 -1126 -6338 0
-6335  6336 -6337 -1126 -6339 0
-6335  6336 -6337 -1126 -6340 0

c  0+1 --> 1
c    (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧  p_1126) -> (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0)
c  in CNF:
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_2
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_1
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨  b^{2, 564}_0
c  in DIMACS:
 6335  6336  6337 -1126 -6338 0
 6335  6336  6337 -1126 -6339 0
 6335  6336  6337 -1126  6340 0

c  1+1 --> 2
c    (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0 ∧  p_1126) -> (-b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0)
c  in CNF:
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_2
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨  b^{2, 564}_1
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ -p_1126 ∨ -b^{2, 564}_0
c  in DIMACS:
 6335  6336 -6337 -1126 -6338 0
 6335  6336 -6337 -1126  6339 0
 6335  6336 -6337 -1126 -6340 0

c  2+1 --> break 
c    (-b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧  p_1126) -> break
c  in CNF:
c     b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ -p_1126 ∨ break
c  in DIMACS:
 6335 -6336  6337 -1126 1162 0


c  2-1 --> 1
c    (-b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧ -p_1126) -> (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0)
c  in CNF:
c     b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_2
c     b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_1
c     b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨  b^{2, 564}_0
c  in DIMACS:
 6335 -6336  6337  1126 -6338 0
 6335 -6336  6337  1126 -6339 0
 6335 -6336  6337  1126  6340 0

c  1-1 --> 0
c    (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0 ∧ -p_1126) -> (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧ -b^{2, 564}_0)
c  in CNF:
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_2
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_1
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_0
c  in DIMACS:
 6335  6336 -6337  1126 -6338 0
 6335  6336 -6337  1126 -6339 0
 6335  6336 -6337  1126 -6340 0

c  0-1 --> -1
c    (-b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧ -p_1126) -> ( b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0)
c  in CNF:
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨  b^{2, 564}_2
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_1
c     b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨  b^{2, 564}_0
c  in DIMACS:
 6335  6336  6337  1126  6338 0
 6335  6336  6337  1126 -6339 0
 6335  6336  6337  1126  6340 0

c  -1-1 --> -2
c    ( b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧  b^{2, 563}_0 ∧ -p_1126) -> ( b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0)
c  in CNF:
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨  b^{2, 564}_2
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨  b^{2, 564}_1
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨  p_1126 ∨ -b^{2, 564}_0
c  in DIMACS:
-6335  6336 -6337  1126  6338 0
-6335  6336 -6337  1126  6339 0
-6335  6336 -6337  1126 -6340 0

c  -2-1 --> break 
c    ( b^{2, 563}_2 ∧  b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧ -p_1126) -> break
c  in CNF:
c    -b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨  b^{2, 563}_0 ∨  p_1126 ∨ break
c  in DIMACS:
-6335 -6336  6337  1126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 563}_2 ∧ -b^{2, 563}_1 ∧ -b^{2, 563}_0 ∧ true) 
c  in CNF:
c    -b^{2, 563}_2 ∨  b^{2, 563}_1 ∨  b^{2, 563}_0 ∨ false 
c  in DIMACS:
-6335  6336  6337  0

c  3 does not represent an automaton state.
c    -(-b^{2, 563}_2 ∧  b^{2, 563}_1 ∧  b^{2, 563}_0 ∧ true) 
c  in CNF:
c     b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ false 
c  in DIMACS:
 6335 -6336 -6337  0
c  -3 does not represent an automaton state.
c    -( b^{2, 563}_2 ∧  b^{2, 563}_1 ∧  b^{2, 563}_0 ∧ true) 
c  in CNF:
c    -b^{2, 563}_2 ∨ -b^{2, 563}_1 ∨ -b^{2, 563}_0 ∨ false 
c  in DIMACS:
-6335 -6336 -6337  0

c i = 564
c  -2+1 --> -1
c    ( b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧  p_1128) -> ( b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0)
c  in CNF:
c    -b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨  b^{2, 565}_2
c    -b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_1
c    -b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨  b^{2, 565}_0
c  in DIMACS:
-6338 -6339  6340 -1128  6341 0
-6338 -6339  6340 -1128 -6342 0
-6338 -6339  6340 -1128  6343 0

c  -1+1 --> 0
c    ( b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0 ∧  p_1128) -> (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧ -b^{2, 565}_0)
c  in CNF:
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_2
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_1
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_0
c  in DIMACS:
-6338  6339 -6340 -1128 -6341 0
-6338  6339 -6340 -1128 -6342 0
-6338  6339 -6340 -1128 -6343 0

c  0+1 --> 1
c    (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧  p_1128) -> (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0)
c  in CNF:
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_2
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_1
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨  b^{2, 565}_0
c  in DIMACS:
 6338  6339  6340 -1128 -6341 0
 6338  6339  6340 -1128 -6342 0
 6338  6339  6340 -1128  6343 0

c  1+1 --> 2
c    (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0 ∧  p_1128) -> (-b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0)
c  in CNF:
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_2
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨  b^{2, 565}_1
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ -p_1128 ∨ -b^{2, 565}_0
c  in DIMACS:
 6338  6339 -6340 -1128 -6341 0
 6338  6339 -6340 -1128  6342 0
 6338  6339 -6340 -1128 -6343 0

c  2+1 --> break 
c    (-b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 6338 -6339  6340 -1128 1162 0


c  2-1 --> 1
c    (-b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧ -p_1128) -> (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0)
c  in CNF:
c     b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_2
c     b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_1
c     b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨  b^{2, 565}_0
c  in DIMACS:
 6338 -6339  6340  1128 -6341 0
 6338 -6339  6340  1128 -6342 0
 6338 -6339  6340  1128  6343 0

c  1-1 --> 0
c    (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0 ∧ -p_1128) -> (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧ -b^{2, 565}_0)
c  in CNF:
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_2
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_1
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_0
c  in DIMACS:
 6338  6339 -6340  1128 -6341 0
 6338  6339 -6340  1128 -6342 0
 6338  6339 -6340  1128 -6343 0

c  0-1 --> -1
c    (-b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧ -p_1128) -> ( b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0)
c  in CNF:
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨  b^{2, 565}_2
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_1
c     b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨  b^{2, 565}_0
c  in DIMACS:
 6338  6339  6340  1128  6341 0
 6338  6339  6340  1128 -6342 0
 6338  6339  6340  1128  6343 0

c  -1-1 --> -2
c    ( b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧  b^{2, 564}_0 ∧ -p_1128) -> ( b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0)
c  in CNF:
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨  b^{2, 565}_2
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨  b^{2, 565}_1
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨  p_1128 ∨ -b^{2, 565}_0
c  in DIMACS:
-6338  6339 -6340  1128  6341 0
-6338  6339 -6340  1128  6342 0
-6338  6339 -6340  1128 -6343 0

c  -2-1 --> break 
c    ( b^{2, 564}_2 ∧  b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨  b^{2, 564}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-6338 -6339  6340  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 564}_2 ∧ -b^{2, 564}_1 ∧ -b^{2, 564}_0 ∧ true) 
c  in CNF:
c    -b^{2, 564}_2 ∨  b^{2, 564}_1 ∨  b^{2, 564}_0 ∨ false 
c  in DIMACS:
-6338  6339  6340  0

c  3 does not represent an automaton state.
c    -(-b^{2, 564}_2 ∧  b^{2, 564}_1 ∧  b^{2, 564}_0 ∧ true) 
c  in CNF:
c     b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ false 
c  in DIMACS:
 6338 -6339 -6340  0
c  -3 does not represent an automaton state.
c    -( b^{2, 564}_2 ∧  b^{2, 564}_1 ∧  b^{2, 564}_0 ∧ true) 
c  in CNF:
c    -b^{2, 564}_2 ∨ -b^{2, 564}_1 ∨ -b^{2, 564}_0 ∨ false 
c  in DIMACS:
-6338 -6339 -6340  0

c i = 565
c  -2+1 --> -1
c    ( b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧  p_1130) -> ( b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0)
c  in CNF:
c    -b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨  b^{2, 566}_2
c    -b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_1
c    -b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨  b^{2, 566}_0
c  in DIMACS:
-6341 -6342  6343 -1130  6344 0
-6341 -6342  6343 -1130 -6345 0
-6341 -6342  6343 -1130  6346 0

c  -1+1 --> 0
c    ( b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0 ∧  p_1130) -> (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧ -b^{2, 566}_0)
c  in CNF:
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_2
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_1
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_0
c  in DIMACS:
-6341  6342 -6343 -1130 -6344 0
-6341  6342 -6343 -1130 -6345 0
-6341  6342 -6343 -1130 -6346 0

c  0+1 --> 1
c    (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧  p_1130) -> (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0)
c  in CNF:
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_2
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_1
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨  b^{2, 566}_0
c  in DIMACS:
 6341  6342  6343 -1130 -6344 0
 6341  6342  6343 -1130 -6345 0
 6341  6342  6343 -1130  6346 0

c  1+1 --> 2
c    (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0 ∧  p_1130) -> (-b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0)
c  in CNF:
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_2
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨  b^{2, 566}_1
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ -p_1130 ∨ -b^{2, 566}_0
c  in DIMACS:
 6341  6342 -6343 -1130 -6344 0
 6341  6342 -6343 -1130  6345 0
 6341  6342 -6343 -1130 -6346 0

c  2+1 --> break 
c    (-b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 6341 -6342  6343 -1130 1162 0


c  2-1 --> 1
c    (-b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧ -p_1130) -> (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0)
c  in CNF:
c     b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_2
c     b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_1
c     b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨  b^{2, 566}_0
c  in DIMACS:
 6341 -6342  6343  1130 -6344 0
 6341 -6342  6343  1130 -6345 0
 6341 -6342  6343  1130  6346 0

c  1-1 --> 0
c    (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0 ∧ -p_1130) -> (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧ -b^{2, 566}_0)
c  in CNF:
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_2
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_1
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_0
c  in DIMACS:
 6341  6342 -6343  1130 -6344 0
 6341  6342 -6343  1130 -6345 0
 6341  6342 -6343  1130 -6346 0

c  0-1 --> -1
c    (-b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧ -p_1130) -> ( b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0)
c  in CNF:
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨  b^{2, 566}_2
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_1
c     b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨  b^{2, 566}_0
c  in DIMACS:
 6341  6342  6343  1130  6344 0
 6341  6342  6343  1130 -6345 0
 6341  6342  6343  1130  6346 0

c  -1-1 --> -2
c    ( b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧  b^{2, 565}_0 ∧ -p_1130) -> ( b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0)
c  in CNF:
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨  b^{2, 566}_2
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨  b^{2, 566}_1
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨  p_1130 ∨ -b^{2, 566}_0
c  in DIMACS:
-6341  6342 -6343  1130  6344 0
-6341  6342 -6343  1130  6345 0
-6341  6342 -6343  1130 -6346 0

c  -2-1 --> break 
c    ( b^{2, 565}_2 ∧  b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨  b^{2, 565}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-6341 -6342  6343  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 565}_2 ∧ -b^{2, 565}_1 ∧ -b^{2, 565}_0 ∧ true) 
c  in CNF:
c    -b^{2, 565}_2 ∨  b^{2, 565}_1 ∨  b^{2, 565}_0 ∨ false 
c  in DIMACS:
-6341  6342  6343  0

c  3 does not represent an automaton state.
c    -(-b^{2, 565}_2 ∧  b^{2, 565}_1 ∧  b^{2, 565}_0 ∧ true) 
c  in CNF:
c     b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ false 
c  in DIMACS:
 6341 -6342 -6343  0
c  -3 does not represent an automaton state.
c    -( b^{2, 565}_2 ∧  b^{2, 565}_1 ∧  b^{2, 565}_0 ∧ true) 
c  in CNF:
c    -b^{2, 565}_2 ∨ -b^{2, 565}_1 ∨ -b^{2, 565}_0 ∨ false 
c  in DIMACS:
-6341 -6342 -6343  0

c i = 566
c  -2+1 --> -1
c    ( b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧  p_1132) -> ( b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0)
c  in CNF:
c    -b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨  b^{2, 567}_2
c    -b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_1
c    -b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨  b^{2, 567}_0
c  in DIMACS:
-6344 -6345  6346 -1132  6347 0
-6344 -6345  6346 -1132 -6348 0
-6344 -6345  6346 -1132  6349 0

c  -1+1 --> 0
c    ( b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0 ∧  p_1132) -> (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧ -b^{2, 567}_0)
c  in CNF:
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_2
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_1
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_0
c  in DIMACS:
-6344  6345 -6346 -1132 -6347 0
-6344  6345 -6346 -1132 -6348 0
-6344  6345 -6346 -1132 -6349 0

c  0+1 --> 1
c    (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧  p_1132) -> (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0)
c  in CNF:
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_2
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_1
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨  b^{2, 567}_0
c  in DIMACS:
 6344  6345  6346 -1132 -6347 0
 6344  6345  6346 -1132 -6348 0
 6344  6345  6346 -1132  6349 0

c  1+1 --> 2
c    (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0 ∧  p_1132) -> (-b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0)
c  in CNF:
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_2
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨  b^{2, 567}_1
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ -p_1132 ∨ -b^{2, 567}_0
c  in DIMACS:
 6344  6345 -6346 -1132 -6347 0
 6344  6345 -6346 -1132  6348 0
 6344  6345 -6346 -1132 -6349 0

c  2+1 --> break 
c    (-b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧  p_1132) -> break
c  in CNF:
c     b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ -p_1132 ∨ break
c  in DIMACS:
 6344 -6345  6346 -1132 1162 0


c  2-1 --> 1
c    (-b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧ -p_1132) -> (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0)
c  in CNF:
c     b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_2
c     b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_1
c     b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨  b^{2, 567}_0
c  in DIMACS:
 6344 -6345  6346  1132 -6347 0
 6344 -6345  6346  1132 -6348 0
 6344 -6345  6346  1132  6349 0

c  1-1 --> 0
c    (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0 ∧ -p_1132) -> (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧ -b^{2, 567}_0)
c  in CNF:
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_2
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_1
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_0
c  in DIMACS:
 6344  6345 -6346  1132 -6347 0
 6344  6345 -6346  1132 -6348 0
 6344  6345 -6346  1132 -6349 0

c  0-1 --> -1
c    (-b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧ -p_1132) -> ( b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0)
c  in CNF:
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨  b^{2, 567}_2
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_1
c     b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨  b^{2, 567}_0
c  in DIMACS:
 6344  6345  6346  1132  6347 0
 6344  6345  6346  1132 -6348 0
 6344  6345  6346  1132  6349 0

c  -1-1 --> -2
c    ( b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧  b^{2, 566}_0 ∧ -p_1132) -> ( b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0)
c  in CNF:
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨  b^{2, 567}_2
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨  b^{2, 567}_1
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨  p_1132 ∨ -b^{2, 567}_0
c  in DIMACS:
-6344  6345 -6346  1132  6347 0
-6344  6345 -6346  1132  6348 0
-6344  6345 -6346  1132 -6349 0

c  -2-1 --> break 
c    ( b^{2, 566}_2 ∧  b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧ -p_1132) -> break
c  in CNF:
c    -b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨  b^{2, 566}_0 ∨  p_1132 ∨ break
c  in DIMACS:
-6344 -6345  6346  1132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 566}_2 ∧ -b^{2, 566}_1 ∧ -b^{2, 566}_0 ∧ true) 
c  in CNF:
c    -b^{2, 566}_2 ∨  b^{2, 566}_1 ∨  b^{2, 566}_0 ∨ false 
c  in DIMACS:
-6344  6345  6346  0

c  3 does not represent an automaton state.
c    -(-b^{2, 566}_2 ∧  b^{2, 566}_1 ∧  b^{2, 566}_0 ∧ true) 
c  in CNF:
c     b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ false 
c  in DIMACS:
 6344 -6345 -6346  0
c  -3 does not represent an automaton state.
c    -( b^{2, 566}_2 ∧  b^{2, 566}_1 ∧  b^{2, 566}_0 ∧ true) 
c  in CNF:
c    -b^{2, 566}_2 ∨ -b^{2, 566}_1 ∨ -b^{2, 566}_0 ∨ false 
c  in DIMACS:
-6344 -6345 -6346  0

c i = 567
c  -2+1 --> -1
c    ( b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧  p_1134) -> ( b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0)
c  in CNF:
c    -b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨  b^{2, 568}_2
c    -b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_1
c    -b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨  b^{2, 568}_0
c  in DIMACS:
-6347 -6348  6349 -1134  6350 0
-6347 -6348  6349 -1134 -6351 0
-6347 -6348  6349 -1134  6352 0

c  -1+1 --> 0
c    ( b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0 ∧  p_1134) -> (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧ -b^{2, 568}_0)
c  in CNF:
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_2
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_1
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_0
c  in DIMACS:
-6347  6348 -6349 -1134 -6350 0
-6347  6348 -6349 -1134 -6351 0
-6347  6348 -6349 -1134 -6352 0

c  0+1 --> 1
c    (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧  p_1134) -> (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0)
c  in CNF:
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_2
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_1
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨  b^{2, 568}_0
c  in DIMACS:
 6347  6348  6349 -1134 -6350 0
 6347  6348  6349 -1134 -6351 0
 6347  6348  6349 -1134  6352 0

c  1+1 --> 2
c    (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0 ∧  p_1134) -> (-b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0)
c  in CNF:
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_2
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨  b^{2, 568}_1
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ -p_1134 ∨ -b^{2, 568}_0
c  in DIMACS:
 6347  6348 -6349 -1134 -6350 0
 6347  6348 -6349 -1134  6351 0
 6347  6348 -6349 -1134 -6352 0

c  2+1 --> break 
c    (-b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 6347 -6348  6349 -1134 1162 0


c  2-1 --> 1
c    (-b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧ -p_1134) -> (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0)
c  in CNF:
c     b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_2
c     b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_1
c     b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨  b^{2, 568}_0
c  in DIMACS:
 6347 -6348  6349  1134 -6350 0
 6347 -6348  6349  1134 -6351 0
 6347 -6348  6349  1134  6352 0

c  1-1 --> 0
c    (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0 ∧ -p_1134) -> (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧ -b^{2, 568}_0)
c  in CNF:
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_2
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_1
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_0
c  in DIMACS:
 6347  6348 -6349  1134 -6350 0
 6347  6348 -6349  1134 -6351 0
 6347  6348 -6349  1134 -6352 0

c  0-1 --> -1
c    (-b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧ -p_1134) -> ( b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0)
c  in CNF:
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨  b^{2, 568}_2
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_1
c     b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨  b^{2, 568}_0
c  in DIMACS:
 6347  6348  6349  1134  6350 0
 6347  6348  6349  1134 -6351 0
 6347  6348  6349  1134  6352 0

c  -1-1 --> -2
c    ( b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧  b^{2, 567}_0 ∧ -p_1134) -> ( b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0)
c  in CNF:
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨  b^{2, 568}_2
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨  b^{2, 568}_1
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨  p_1134 ∨ -b^{2, 568}_0
c  in DIMACS:
-6347  6348 -6349  1134  6350 0
-6347  6348 -6349  1134  6351 0
-6347  6348 -6349  1134 -6352 0

c  -2-1 --> break 
c    ( b^{2, 567}_2 ∧  b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨  b^{2, 567}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-6347 -6348  6349  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 567}_2 ∧ -b^{2, 567}_1 ∧ -b^{2, 567}_0 ∧ true) 
c  in CNF:
c    -b^{2, 567}_2 ∨  b^{2, 567}_1 ∨  b^{2, 567}_0 ∨ false 
c  in DIMACS:
-6347  6348  6349  0

c  3 does not represent an automaton state.
c    -(-b^{2, 567}_2 ∧  b^{2, 567}_1 ∧  b^{2, 567}_0 ∧ true) 
c  in CNF:
c     b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ false 
c  in DIMACS:
 6347 -6348 -6349  0
c  -3 does not represent an automaton state.
c    -( b^{2, 567}_2 ∧  b^{2, 567}_1 ∧  b^{2, 567}_0 ∧ true) 
c  in CNF:
c    -b^{2, 567}_2 ∨ -b^{2, 567}_1 ∨ -b^{2, 567}_0 ∨ false 
c  in DIMACS:
-6347 -6348 -6349  0

c i = 568
c  -2+1 --> -1
c    ( b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧  p_1136) -> ( b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0)
c  in CNF:
c    -b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨  b^{2, 569}_2
c    -b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_1
c    -b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨  b^{2, 569}_0
c  in DIMACS:
-6350 -6351  6352 -1136  6353 0
-6350 -6351  6352 -1136 -6354 0
-6350 -6351  6352 -1136  6355 0

c  -1+1 --> 0
c    ( b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0 ∧  p_1136) -> (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧ -b^{2, 569}_0)
c  in CNF:
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_2
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_1
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_0
c  in DIMACS:
-6350  6351 -6352 -1136 -6353 0
-6350  6351 -6352 -1136 -6354 0
-6350  6351 -6352 -1136 -6355 0

c  0+1 --> 1
c    (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧  p_1136) -> (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0)
c  in CNF:
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_2
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_1
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨  b^{2, 569}_0
c  in DIMACS:
 6350  6351  6352 -1136 -6353 0
 6350  6351  6352 -1136 -6354 0
 6350  6351  6352 -1136  6355 0

c  1+1 --> 2
c    (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0 ∧  p_1136) -> (-b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0)
c  in CNF:
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_2
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨  b^{2, 569}_1
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ -p_1136 ∨ -b^{2, 569}_0
c  in DIMACS:
 6350  6351 -6352 -1136 -6353 0
 6350  6351 -6352 -1136  6354 0
 6350  6351 -6352 -1136 -6355 0

c  2+1 --> break 
c    (-b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 6350 -6351  6352 -1136 1162 0


c  2-1 --> 1
c    (-b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧ -p_1136) -> (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0)
c  in CNF:
c     b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_2
c     b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_1
c     b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨  b^{2, 569}_0
c  in DIMACS:
 6350 -6351  6352  1136 -6353 0
 6350 -6351  6352  1136 -6354 0
 6350 -6351  6352  1136  6355 0

c  1-1 --> 0
c    (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0 ∧ -p_1136) -> (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧ -b^{2, 569}_0)
c  in CNF:
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_2
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_1
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_0
c  in DIMACS:
 6350  6351 -6352  1136 -6353 0
 6350  6351 -6352  1136 -6354 0
 6350  6351 -6352  1136 -6355 0

c  0-1 --> -1
c    (-b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧ -p_1136) -> ( b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0)
c  in CNF:
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨  b^{2, 569}_2
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_1
c     b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨  b^{2, 569}_0
c  in DIMACS:
 6350  6351  6352  1136  6353 0
 6350  6351  6352  1136 -6354 0
 6350  6351  6352  1136  6355 0

c  -1-1 --> -2
c    ( b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧  b^{2, 568}_0 ∧ -p_1136) -> ( b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0)
c  in CNF:
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨  b^{2, 569}_2
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨  b^{2, 569}_1
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨  p_1136 ∨ -b^{2, 569}_0
c  in DIMACS:
-6350  6351 -6352  1136  6353 0
-6350  6351 -6352  1136  6354 0
-6350  6351 -6352  1136 -6355 0

c  -2-1 --> break 
c    ( b^{2, 568}_2 ∧  b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨  b^{2, 568}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-6350 -6351  6352  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 568}_2 ∧ -b^{2, 568}_1 ∧ -b^{2, 568}_0 ∧ true) 
c  in CNF:
c    -b^{2, 568}_2 ∨  b^{2, 568}_1 ∨  b^{2, 568}_0 ∨ false 
c  in DIMACS:
-6350  6351  6352  0

c  3 does not represent an automaton state.
c    -(-b^{2, 568}_2 ∧  b^{2, 568}_1 ∧  b^{2, 568}_0 ∧ true) 
c  in CNF:
c     b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ false 
c  in DIMACS:
 6350 -6351 -6352  0
c  -3 does not represent an automaton state.
c    -( b^{2, 568}_2 ∧  b^{2, 568}_1 ∧  b^{2, 568}_0 ∧ true) 
c  in CNF:
c    -b^{2, 568}_2 ∨ -b^{2, 568}_1 ∨ -b^{2, 568}_0 ∨ false 
c  in DIMACS:
-6350 -6351 -6352  0

c i = 569
c  -2+1 --> -1
c    ( b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧  p_1138) -> ( b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0)
c  in CNF:
c    -b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨  b^{2, 570}_2
c    -b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_1
c    -b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨  b^{2, 570}_0
c  in DIMACS:
-6353 -6354  6355 -1138  6356 0
-6353 -6354  6355 -1138 -6357 0
-6353 -6354  6355 -1138  6358 0

c  -1+1 --> 0
c    ( b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0 ∧  p_1138) -> (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧ -b^{2, 570}_0)
c  in CNF:
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_2
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_1
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_0
c  in DIMACS:
-6353  6354 -6355 -1138 -6356 0
-6353  6354 -6355 -1138 -6357 0
-6353  6354 -6355 -1138 -6358 0

c  0+1 --> 1
c    (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧  p_1138) -> (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0)
c  in CNF:
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_2
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_1
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨  b^{2, 570}_0
c  in DIMACS:
 6353  6354  6355 -1138 -6356 0
 6353  6354  6355 -1138 -6357 0
 6353  6354  6355 -1138  6358 0

c  1+1 --> 2
c    (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0 ∧  p_1138) -> (-b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0)
c  in CNF:
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_2
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨  b^{2, 570}_1
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ -p_1138 ∨ -b^{2, 570}_0
c  in DIMACS:
 6353  6354 -6355 -1138 -6356 0
 6353  6354 -6355 -1138  6357 0
 6353  6354 -6355 -1138 -6358 0

c  2+1 --> break 
c    (-b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧  p_1138) -> break
c  in CNF:
c     b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ -p_1138 ∨ break
c  in DIMACS:
 6353 -6354  6355 -1138 1162 0


c  2-1 --> 1
c    (-b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧ -p_1138) -> (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0)
c  in CNF:
c     b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_2
c     b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_1
c     b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨  b^{2, 570}_0
c  in DIMACS:
 6353 -6354  6355  1138 -6356 0
 6353 -6354  6355  1138 -6357 0
 6353 -6354  6355  1138  6358 0

c  1-1 --> 0
c    (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0 ∧ -p_1138) -> (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧ -b^{2, 570}_0)
c  in CNF:
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_2
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_1
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_0
c  in DIMACS:
 6353  6354 -6355  1138 -6356 0
 6353  6354 -6355  1138 -6357 0
 6353  6354 -6355  1138 -6358 0

c  0-1 --> -1
c    (-b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧ -p_1138) -> ( b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0)
c  in CNF:
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨  b^{2, 570}_2
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_1
c     b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨  b^{2, 570}_0
c  in DIMACS:
 6353  6354  6355  1138  6356 0
 6353  6354  6355  1138 -6357 0
 6353  6354  6355  1138  6358 0

c  -1-1 --> -2
c    ( b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧  b^{2, 569}_0 ∧ -p_1138) -> ( b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0)
c  in CNF:
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨  b^{2, 570}_2
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨  b^{2, 570}_1
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨  p_1138 ∨ -b^{2, 570}_0
c  in DIMACS:
-6353  6354 -6355  1138  6356 0
-6353  6354 -6355  1138  6357 0
-6353  6354 -6355  1138 -6358 0

c  -2-1 --> break 
c    ( b^{2, 569}_2 ∧  b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧ -p_1138) -> break
c  in CNF:
c    -b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨  b^{2, 569}_0 ∨  p_1138 ∨ break
c  in DIMACS:
-6353 -6354  6355  1138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 569}_2 ∧ -b^{2, 569}_1 ∧ -b^{2, 569}_0 ∧ true) 
c  in CNF:
c    -b^{2, 569}_2 ∨  b^{2, 569}_1 ∨  b^{2, 569}_0 ∨ false 
c  in DIMACS:
-6353  6354  6355  0

c  3 does not represent an automaton state.
c    -(-b^{2, 569}_2 ∧  b^{2, 569}_1 ∧  b^{2, 569}_0 ∧ true) 
c  in CNF:
c     b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ false 
c  in DIMACS:
 6353 -6354 -6355  0
c  -3 does not represent an automaton state.
c    -( b^{2, 569}_2 ∧  b^{2, 569}_1 ∧  b^{2, 569}_0 ∧ true) 
c  in CNF:
c    -b^{2, 569}_2 ∨ -b^{2, 569}_1 ∨ -b^{2, 569}_0 ∨ false 
c  in DIMACS:
-6353 -6354 -6355  0

c i = 570
c  -2+1 --> -1
c    ( b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧  p_1140) -> ( b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0)
c  in CNF:
c    -b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨  b^{2, 571}_2
c    -b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_1
c    -b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨  b^{2, 571}_0
c  in DIMACS:
-6356 -6357  6358 -1140  6359 0
-6356 -6357  6358 -1140 -6360 0
-6356 -6357  6358 -1140  6361 0

c  -1+1 --> 0
c    ( b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0 ∧  p_1140) -> (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧ -b^{2, 571}_0)
c  in CNF:
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_2
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_1
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_0
c  in DIMACS:
-6356  6357 -6358 -1140 -6359 0
-6356  6357 -6358 -1140 -6360 0
-6356  6357 -6358 -1140 -6361 0

c  0+1 --> 1
c    (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧  p_1140) -> (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0)
c  in CNF:
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_2
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_1
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨  b^{2, 571}_0
c  in DIMACS:
 6356  6357  6358 -1140 -6359 0
 6356  6357  6358 -1140 -6360 0
 6356  6357  6358 -1140  6361 0

c  1+1 --> 2
c    (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0 ∧  p_1140) -> (-b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0)
c  in CNF:
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_2
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨  b^{2, 571}_1
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ -p_1140 ∨ -b^{2, 571}_0
c  in DIMACS:
 6356  6357 -6358 -1140 -6359 0
 6356  6357 -6358 -1140  6360 0
 6356  6357 -6358 -1140 -6361 0

c  2+1 --> break 
c    (-b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 6356 -6357  6358 -1140 1162 0


c  2-1 --> 1
c    (-b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧ -p_1140) -> (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0)
c  in CNF:
c     b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_2
c     b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_1
c     b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨  b^{2, 571}_0
c  in DIMACS:
 6356 -6357  6358  1140 -6359 0
 6356 -6357  6358  1140 -6360 0
 6356 -6357  6358  1140  6361 0

c  1-1 --> 0
c    (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0 ∧ -p_1140) -> (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧ -b^{2, 571}_0)
c  in CNF:
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_2
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_1
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_0
c  in DIMACS:
 6356  6357 -6358  1140 -6359 0
 6356  6357 -6358  1140 -6360 0
 6356  6357 -6358  1140 -6361 0

c  0-1 --> -1
c    (-b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧ -p_1140) -> ( b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0)
c  in CNF:
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨  b^{2, 571}_2
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_1
c     b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨  b^{2, 571}_0
c  in DIMACS:
 6356  6357  6358  1140  6359 0
 6356  6357  6358  1140 -6360 0
 6356  6357  6358  1140  6361 0

c  -1-1 --> -2
c    ( b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧  b^{2, 570}_0 ∧ -p_1140) -> ( b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0)
c  in CNF:
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨  b^{2, 571}_2
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨  b^{2, 571}_1
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨  p_1140 ∨ -b^{2, 571}_0
c  in DIMACS:
-6356  6357 -6358  1140  6359 0
-6356  6357 -6358  1140  6360 0
-6356  6357 -6358  1140 -6361 0

c  -2-1 --> break 
c    ( b^{2, 570}_2 ∧  b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨  b^{2, 570}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-6356 -6357  6358  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 570}_2 ∧ -b^{2, 570}_1 ∧ -b^{2, 570}_0 ∧ true) 
c  in CNF:
c    -b^{2, 570}_2 ∨  b^{2, 570}_1 ∨  b^{2, 570}_0 ∨ false 
c  in DIMACS:
-6356  6357  6358  0

c  3 does not represent an automaton state.
c    -(-b^{2, 570}_2 ∧  b^{2, 570}_1 ∧  b^{2, 570}_0 ∧ true) 
c  in CNF:
c     b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ false 
c  in DIMACS:
 6356 -6357 -6358  0
c  -3 does not represent an automaton state.
c    -( b^{2, 570}_2 ∧  b^{2, 570}_1 ∧  b^{2, 570}_0 ∧ true) 
c  in CNF:
c    -b^{2, 570}_2 ∨ -b^{2, 570}_1 ∨ -b^{2, 570}_0 ∨ false 
c  in DIMACS:
-6356 -6357 -6358  0

c i = 571
c  -2+1 --> -1
c    ( b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧  p_1142) -> ( b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0)
c  in CNF:
c    -b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨  b^{2, 572}_2
c    -b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_1
c    -b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨  b^{2, 572}_0
c  in DIMACS:
-6359 -6360  6361 -1142  6362 0
-6359 -6360  6361 -1142 -6363 0
-6359 -6360  6361 -1142  6364 0

c  -1+1 --> 0
c    ( b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0 ∧  p_1142) -> (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧ -b^{2, 572}_0)
c  in CNF:
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_2
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_1
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_0
c  in DIMACS:
-6359  6360 -6361 -1142 -6362 0
-6359  6360 -6361 -1142 -6363 0
-6359  6360 -6361 -1142 -6364 0

c  0+1 --> 1
c    (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧  p_1142) -> (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0)
c  in CNF:
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_2
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_1
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨  b^{2, 572}_0
c  in DIMACS:
 6359  6360  6361 -1142 -6362 0
 6359  6360  6361 -1142 -6363 0
 6359  6360  6361 -1142  6364 0

c  1+1 --> 2
c    (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0 ∧  p_1142) -> (-b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0)
c  in CNF:
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_2
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨  b^{2, 572}_1
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ -p_1142 ∨ -b^{2, 572}_0
c  in DIMACS:
 6359  6360 -6361 -1142 -6362 0
 6359  6360 -6361 -1142  6363 0
 6359  6360 -6361 -1142 -6364 0

c  2+1 --> break 
c    (-b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧  p_1142) -> break
c  in CNF:
c     b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ -p_1142 ∨ break
c  in DIMACS:
 6359 -6360  6361 -1142 1162 0


c  2-1 --> 1
c    (-b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧ -p_1142) -> (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0)
c  in CNF:
c     b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_2
c     b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_1
c     b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨  b^{2, 572}_0
c  in DIMACS:
 6359 -6360  6361  1142 -6362 0
 6359 -6360  6361  1142 -6363 0
 6359 -6360  6361  1142  6364 0

c  1-1 --> 0
c    (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0 ∧ -p_1142) -> (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧ -b^{2, 572}_0)
c  in CNF:
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_2
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_1
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_0
c  in DIMACS:
 6359  6360 -6361  1142 -6362 0
 6359  6360 -6361  1142 -6363 0
 6359  6360 -6361  1142 -6364 0

c  0-1 --> -1
c    (-b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧ -p_1142) -> ( b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0)
c  in CNF:
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨  b^{2, 572}_2
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_1
c     b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨  b^{2, 572}_0
c  in DIMACS:
 6359  6360  6361  1142  6362 0
 6359  6360  6361  1142 -6363 0
 6359  6360  6361  1142  6364 0

c  -1-1 --> -2
c    ( b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧  b^{2, 571}_0 ∧ -p_1142) -> ( b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0)
c  in CNF:
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨  b^{2, 572}_2
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨  b^{2, 572}_1
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨  p_1142 ∨ -b^{2, 572}_0
c  in DIMACS:
-6359  6360 -6361  1142  6362 0
-6359  6360 -6361  1142  6363 0
-6359  6360 -6361  1142 -6364 0

c  -2-1 --> break 
c    ( b^{2, 571}_2 ∧  b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧ -p_1142) -> break
c  in CNF:
c    -b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨  b^{2, 571}_0 ∨  p_1142 ∨ break
c  in DIMACS:
-6359 -6360  6361  1142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 571}_2 ∧ -b^{2, 571}_1 ∧ -b^{2, 571}_0 ∧ true) 
c  in CNF:
c    -b^{2, 571}_2 ∨  b^{2, 571}_1 ∨  b^{2, 571}_0 ∨ false 
c  in DIMACS:
-6359  6360  6361  0

c  3 does not represent an automaton state.
c    -(-b^{2, 571}_2 ∧  b^{2, 571}_1 ∧  b^{2, 571}_0 ∧ true) 
c  in CNF:
c     b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ false 
c  in DIMACS:
 6359 -6360 -6361  0
c  -3 does not represent an automaton state.
c    -( b^{2, 571}_2 ∧  b^{2, 571}_1 ∧  b^{2, 571}_0 ∧ true) 
c  in CNF:
c    -b^{2, 571}_2 ∨ -b^{2, 571}_1 ∨ -b^{2, 571}_0 ∨ false 
c  in DIMACS:
-6359 -6360 -6361  0

c i = 572
c  -2+1 --> -1
c    ( b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧  p_1144) -> ( b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0)
c  in CNF:
c    -b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨  b^{2, 573}_2
c    -b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_1
c    -b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨  b^{2, 573}_0
c  in DIMACS:
-6362 -6363  6364 -1144  6365 0
-6362 -6363  6364 -1144 -6366 0
-6362 -6363  6364 -1144  6367 0

c  -1+1 --> 0
c    ( b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0 ∧  p_1144) -> (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧ -b^{2, 573}_0)
c  in CNF:
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_2
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_1
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_0
c  in DIMACS:
-6362  6363 -6364 -1144 -6365 0
-6362  6363 -6364 -1144 -6366 0
-6362  6363 -6364 -1144 -6367 0

c  0+1 --> 1
c    (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧  p_1144) -> (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0)
c  in CNF:
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_2
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_1
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨  b^{2, 573}_0
c  in DIMACS:
 6362  6363  6364 -1144 -6365 0
 6362  6363  6364 -1144 -6366 0
 6362  6363  6364 -1144  6367 0

c  1+1 --> 2
c    (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0 ∧  p_1144) -> (-b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0)
c  in CNF:
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_2
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨  b^{2, 573}_1
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ -p_1144 ∨ -b^{2, 573}_0
c  in DIMACS:
 6362  6363 -6364 -1144 -6365 0
 6362  6363 -6364 -1144  6366 0
 6362  6363 -6364 -1144 -6367 0

c  2+1 --> break 
c    (-b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 6362 -6363  6364 -1144 1162 0


c  2-1 --> 1
c    (-b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧ -p_1144) -> (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0)
c  in CNF:
c     b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_2
c     b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_1
c     b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨  b^{2, 573}_0
c  in DIMACS:
 6362 -6363  6364  1144 -6365 0
 6362 -6363  6364  1144 -6366 0
 6362 -6363  6364  1144  6367 0

c  1-1 --> 0
c    (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0 ∧ -p_1144) -> (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧ -b^{2, 573}_0)
c  in CNF:
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_2
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_1
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_0
c  in DIMACS:
 6362  6363 -6364  1144 -6365 0
 6362  6363 -6364  1144 -6366 0
 6362  6363 -6364  1144 -6367 0

c  0-1 --> -1
c    (-b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧ -p_1144) -> ( b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0)
c  in CNF:
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨  b^{2, 573}_2
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_1
c     b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨  b^{2, 573}_0
c  in DIMACS:
 6362  6363  6364  1144  6365 0
 6362  6363  6364  1144 -6366 0
 6362  6363  6364  1144  6367 0

c  -1-1 --> -2
c    ( b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧  b^{2, 572}_0 ∧ -p_1144) -> ( b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0)
c  in CNF:
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨  b^{2, 573}_2
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨  b^{2, 573}_1
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨  p_1144 ∨ -b^{2, 573}_0
c  in DIMACS:
-6362  6363 -6364  1144  6365 0
-6362  6363 -6364  1144  6366 0
-6362  6363 -6364  1144 -6367 0

c  -2-1 --> break 
c    ( b^{2, 572}_2 ∧  b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨  b^{2, 572}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-6362 -6363  6364  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 572}_2 ∧ -b^{2, 572}_1 ∧ -b^{2, 572}_0 ∧ true) 
c  in CNF:
c    -b^{2, 572}_2 ∨  b^{2, 572}_1 ∨  b^{2, 572}_0 ∨ false 
c  in DIMACS:
-6362  6363  6364  0

c  3 does not represent an automaton state.
c    -(-b^{2, 572}_2 ∧  b^{2, 572}_1 ∧  b^{2, 572}_0 ∧ true) 
c  in CNF:
c     b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ false 
c  in DIMACS:
 6362 -6363 -6364  0
c  -3 does not represent an automaton state.
c    -( b^{2, 572}_2 ∧  b^{2, 572}_1 ∧  b^{2, 572}_0 ∧ true) 
c  in CNF:
c    -b^{2, 572}_2 ∨ -b^{2, 572}_1 ∨ -b^{2, 572}_0 ∨ false 
c  in DIMACS:
-6362 -6363 -6364  0

c i = 573
c  -2+1 --> -1
c    ( b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧  p_1146) -> ( b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0)
c  in CNF:
c    -b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨  b^{2, 574}_2
c    -b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_1
c    -b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨  b^{2, 574}_0
c  in DIMACS:
-6365 -6366  6367 -1146  6368 0
-6365 -6366  6367 -1146 -6369 0
-6365 -6366  6367 -1146  6370 0

c  -1+1 --> 0
c    ( b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0 ∧  p_1146) -> (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧ -b^{2, 574}_0)
c  in CNF:
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_2
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_1
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_0
c  in DIMACS:
-6365  6366 -6367 -1146 -6368 0
-6365  6366 -6367 -1146 -6369 0
-6365  6366 -6367 -1146 -6370 0

c  0+1 --> 1
c    (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧  p_1146) -> (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0)
c  in CNF:
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_2
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_1
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨  b^{2, 574}_0
c  in DIMACS:
 6365  6366  6367 -1146 -6368 0
 6365  6366  6367 -1146 -6369 0
 6365  6366  6367 -1146  6370 0

c  1+1 --> 2
c    (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0 ∧  p_1146) -> (-b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0)
c  in CNF:
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_2
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨  b^{2, 574}_1
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ -p_1146 ∨ -b^{2, 574}_0
c  in DIMACS:
 6365  6366 -6367 -1146 -6368 0
 6365  6366 -6367 -1146  6369 0
 6365  6366 -6367 -1146 -6370 0

c  2+1 --> break 
c    (-b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 6365 -6366  6367 -1146 1162 0


c  2-1 --> 1
c    (-b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧ -p_1146) -> (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0)
c  in CNF:
c     b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_2
c     b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_1
c     b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨  b^{2, 574}_0
c  in DIMACS:
 6365 -6366  6367  1146 -6368 0
 6365 -6366  6367  1146 -6369 0
 6365 -6366  6367  1146  6370 0

c  1-1 --> 0
c    (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0 ∧ -p_1146) -> (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧ -b^{2, 574}_0)
c  in CNF:
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_2
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_1
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_0
c  in DIMACS:
 6365  6366 -6367  1146 -6368 0
 6365  6366 -6367  1146 -6369 0
 6365  6366 -6367  1146 -6370 0

c  0-1 --> -1
c    (-b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧ -p_1146) -> ( b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0)
c  in CNF:
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨  b^{2, 574}_2
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_1
c     b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨  b^{2, 574}_0
c  in DIMACS:
 6365  6366  6367  1146  6368 0
 6365  6366  6367  1146 -6369 0
 6365  6366  6367  1146  6370 0

c  -1-1 --> -2
c    ( b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧  b^{2, 573}_0 ∧ -p_1146) -> ( b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0)
c  in CNF:
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨  b^{2, 574}_2
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨  b^{2, 574}_1
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨  p_1146 ∨ -b^{2, 574}_0
c  in DIMACS:
-6365  6366 -6367  1146  6368 0
-6365  6366 -6367  1146  6369 0
-6365  6366 -6367  1146 -6370 0

c  -2-1 --> break 
c    ( b^{2, 573}_2 ∧  b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨  b^{2, 573}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-6365 -6366  6367  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 573}_2 ∧ -b^{2, 573}_1 ∧ -b^{2, 573}_0 ∧ true) 
c  in CNF:
c    -b^{2, 573}_2 ∨  b^{2, 573}_1 ∨  b^{2, 573}_0 ∨ false 
c  in DIMACS:
-6365  6366  6367  0

c  3 does not represent an automaton state.
c    -(-b^{2, 573}_2 ∧  b^{2, 573}_1 ∧  b^{2, 573}_0 ∧ true) 
c  in CNF:
c     b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ false 
c  in DIMACS:
 6365 -6366 -6367  0
c  -3 does not represent an automaton state.
c    -( b^{2, 573}_2 ∧  b^{2, 573}_1 ∧  b^{2, 573}_0 ∧ true) 
c  in CNF:
c    -b^{2, 573}_2 ∨ -b^{2, 573}_1 ∨ -b^{2, 573}_0 ∨ false 
c  in DIMACS:
-6365 -6366 -6367  0

c i = 574
c  -2+1 --> -1
c    ( b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧  p_1148) -> ( b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0)
c  in CNF:
c    -b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨  b^{2, 575}_2
c    -b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_1
c    -b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨  b^{2, 575}_0
c  in DIMACS:
-6368 -6369  6370 -1148  6371 0
-6368 -6369  6370 -1148 -6372 0
-6368 -6369  6370 -1148  6373 0

c  -1+1 --> 0
c    ( b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0 ∧  p_1148) -> (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧ -b^{2, 575}_0)
c  in CNF:
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_2
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_1
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_0
c  in DIMACS:
-6368  6369 -6370 -1148 -6371 0
-6368  6369 -6370 -1148 -6372 0
-6368  6369 -6370 -1148 -6373 0

c  0+1 --> 1
c    (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧  p_1148) -> (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0)
c  in CNF:
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_2
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_1
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨  b^{2, 575}_0
c  in DIMACS:
 6368  6369  6370 -1148 -6371 0
 6368  6369  6370 -1148 -6372 0
 6368  6369  6370 -1148  6373 0

c  1+1 --> 2
c    (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0 ∧  p_1148) -> (-b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0)
c  in CNF:
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_2
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨  b^{2, 575}_1
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ -p_1148 ∨ -b^{2, 575}_0
c  in DIMACS:
 6368  6369 -6370 -1148 -6371 0
 6368  6369 -6370 -1148  6372 0
 6368  6369 -6370 -1148 -6373 0

c  2+1 --> break 
c    (-b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 6368 -6369  6370 -1148 1162 0


c  2-1 --> 1
c    (-b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧ -p_1148) -> (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0)
c  in CNF:
c     b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_2
c     b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_1
c     b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨  b^{2, 575}_0
c  in DIMACS:
 6368 -6369  6370  1148 -6371 0
 6368 -6369  6370  1148 -6372 0
 6368 -6369  6370  1148  6373 0

c  1-1 --> 0
c    (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0 ∧ -p_1148) -> (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧ -b^{2, 575}_0)
c  in CNF:
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_2
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_1
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_0
c  in DIMACS:
 6368  6369 -6370  1148 -6371 0
 6368  6369 -6370  1148 -6372 0
 6368  6369 -6370  1148 -6373 0

c  0-1 --> -1
c    (-b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧ -p_1148) -> ( b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0)
c  in CNF:
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨  b^{2, 575}_2
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_1
c     b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨  b^{2, 575}_0
c  in DIMACS:
 6368  6369  6370  1148  6371 0
 6368  6369  6370  1148 -6372 0
 6368  6369  6370  1148  6373 0

c  -1-1 --> -2
c    ( b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧  b^{2, 574}_0 ∧ -p_1148) -> ( b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0)
c  in CNF:
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨  b^{2, 575}_2
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨  b^{2, 575}_1
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨  p_1148 ∨ -b^{2, 575}_0
c  in DIMACS:
-6368  6369 -6370  1148  6371 0
-6368  6369 -6370  1148  6372 0
-6368  6369 -6370  1148 -6373 0

c  -2-1 --> break 
c    ( b^{2, 574}_2 ∧  b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨  b^{2, 574}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-6368 -6369  6370  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 574}_2 ∧ -b^{2, 574}_1 ∧ -b^{2, 574}_0 ∧ true) 
c  in CNF:
c    -b^{2, 574}_2 ∨  b^{2, 574}_1 ∨  b^{2, 574}_0 ∨ false 
c  in DIMACS:
-6368  6369  6370  0

c  3 does not represent an automaton state.
c    -(-b^{2, 574}_2 ∧  b^{2, 574}_1 ∧  b^{2, 574}_0 ∧ true) 
c  in CNF:
c     b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ false 
c  in DIMACS:
 6368 -6369 -6370  0
c  -3 does not represent an automaton state.
c    -( b^{2, 574}_2 ∧  b^{2, 574}_1 ∧  b^{2, 574}_0 ∧ true) 
c  in CNF:
c    -b^{2, 574}_2 ∨ -b^{2, 574}_1 ∨ -b^{2, 574}_0 ∨ false 
c  in DIMACS:
-6368 -6369 -6370  0

c i = 575
c  -2+1 --> -1
c    ( b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧  p_1150) -> ( b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0)
c  in CNF:
c    -b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨  b^{2, 576}_2
c    -b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_1
c    -b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨  b^{2, 576}_0
c  in DIMACS:
-6371 -6372  6373 -1150  6374 0
-6371 -6372  6373 -1150 -6375 0
-6371 -6372  6373 -1150  6376 0

c  -1+1 --> 0
c    ( b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0 ∧  p_1150) -> (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧ -b^{2, 576}_0)
c  in CNF:
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_2
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_1
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_0
c  in DIMACS:
-6371  6372 -6373 -1150 -6374 0
-6371  6372 -6373 -1150 -6375 0
-6371  6372 -6373 -1150 -6376 0

c  0+1 --> 1
c    (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧  p_1150) -> (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0)
c  in CNF:
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_2
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_1
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨  b^{2, 576}_0
c  in DIMACS:
 6371  6372  6373 -1150 -6374 0
 6371  6372  6373 -1150 -6375 0
 6371  6372  6373 -1150  6376 0

c  1+1 --> 2
c    (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0 ∧  p_1150) -> (-b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0)
c  in CNF:
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_2
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨  b^{2, 576}_1
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ -p_1150 ∨ -b^{2, 576}_0
c  in DIMACS:
 6371  6372 -6373 -1150 -6374 0
 6371  6372 -6373 -1150  6375 0
 6371  6372 -6373 -1150 -6376 0

c  2+1 --> break 
c    (-b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 6371 -6372  6373 -1150 1162 0


c  2-1 --> 1
c    (-b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧ -p_1150) -> (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0)
c  in CNF:
c     b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_2
c     b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_1
c     b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨  b^{2, 576}_0
c  in DIMACS:
 6371 -6372  6373  1150 -6374 0
 6371 -6372  6373  1150 -6375 0
 6371 -6372  6373  1150  6376 0

c  1-1 --> 0
c    (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0 ∧ -p_1150) -> (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧ -b^{2, 576}_0)
c  in CNF:
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_2
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_1
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_0
c  in DIMACS:
 6371  6372 -6373  1150 -6374 0
 6371  6372 -6373  1150 -6375 0
 6371  6372 -6373  1150 -6376 0

c  0-1 --> -1
c    (-b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧ -p_1150) -> ( b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0)
c  in CNF:
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨  b^{2, 576}_2
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_1
c     b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨  b^{2, 576}_0
c  in DIMACS:
 6371  6372  6373  1150  6374 0
 6371  6372  6373  1150 -6375 0
 6371  6372  6373  1150  6376 0

c  -1-1 --> -2
c    ( b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧  b^{2, 575}_0 ∧ -p_1150) -> ( b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0)
c  in CNF:
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨  b^{2, 576}_2
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨  b^{2, 576}_1
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨  p_1150 ∨ -b^{2, 576}_0
c  in DIMACS:
-6371  6372 -6373  1150  6374 0
-6371  6372 -6373  1150  6375 0
-6371  6372 -6373  1150 -6376 0

c  -2-1 --> break 
c    ( b^{2, 575}_2 ∧  b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨  b^{2, 575}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-6371 -6372  6373  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 575}_2 ∧ -b^{2, 575}_1 ∧ -b^{2, 575}_0 ∧ true) 
c  in CNF:
c    -b^{2, 575}_2 ∨  b^{2, 575}_1 ∨  b^{2, 575}_0 ∨ false 
c  in DIMACS:
-6371  6372  6373  0

c  3 does not represent an automaton state.
c    -(-b^{2, 575}_2 ∧  b^{2, 575}_1 ∧  b^{2, 575}_0 ∧ true) 
c  in CNF:
c     b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ false 
c  in DIMACS:
 6371 -6372 -6373  0
c  -3 does not represent an automaton state.
c    -( b^{2, 575}_2 ∧  b^{2, 575}_1 ∧  b^{2, 575}_0 ∧ true) 
c  in CNF:
c    -b^{2, 575}_2 ∨ -b^{2, 575}_1 ∨ -b^{2, 575}_0 ∨ false 
c  in DIMACS:
-6371 -6372 -6373  0

c i = 576
c  -2+1 --> -1
c    ( b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧  p_1152) -> ( b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0)
c  in CNF:
c    -b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨  b^{2, 577}_2
c    -b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_1
c    -b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨  b^{2, 577}_0
c  in DIMACS:
-6374 -6375  6376 -1152  6377 0
-6374 -6375  6376 -1152 -6378 0
-6374 -6375  6376 -1152  6379 0

c  -1+1 --> 0
c    ( b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0 ∧  p_1152) -> (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧ -b^{2, 577}_0)
c  in CNF:
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_2
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_1
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_0
c  in DIMACS:
-6374  6375 -6376 -1152 -6377 0
-6374  6375 -6376 -1152 -6378 0
-6374  6375 -6376 -1152 -6379 0

c  0+1 --> 1
c    (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧  p_1152) -> (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0)
c  in CNF:
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_2
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_1
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨  b^{2, 577}_0
c  in DIMACS:
 6374  6375  6376 -1152 -6377 0
 6374  6375  6376 -1152 -6378 0
 6374  6375  6376 -1152  6379 0

c  1+1 --> 2
c    (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0 ∧  p_1152) -> (-b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0)
c  in CNF:
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_2
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨  b^{2, 577}_1
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ -p_1152 ∨ -b^{2, 577}_0
c  in DIMACS:
 6374  6375 -6376 -1152 -6377 0
 6374  6375 -6376 -1152  6378 0
 6374  6375 -6376 -1152 -6379 0

c  2+1 --> break 
c    (-b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 6374 -6375  6376 -1152 1162 0


c  2-1 --> 1
c    (-b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧ -p_1152) -> (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0)
c  in CNF:
c     b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_2
c     b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_1
c     b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨  b^{2, 577}_0
c  in DIMACS:
 6374 -6375  6376  1152 -6377 0
 6374 -6375  6376  1152 -6378 0
 6374 -6375  6376  1152  6379 0

c  1-1 --> 0
c    (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0 ∧ -p_1152) -> (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧ -b^{2, 577}_0)
c  in CNF:
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_2
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_1
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_0
c  in DIMACS:
 6374  6375 -6376  1152 -6377 0
 6374  6375 -6376  1152 -6378 0
 6374  6375 -6376  1152 -6379 0

c  0-1 --> -1
c    (-b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧ -p_1152) -> ( b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0)
c  in CNF:
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨  b^{2, 577}_2
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_1
c     b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨  b^{2, 577}_0
c  in DIMACS:
 6374  6375  6376  1152  6377 0
 6374  6375  6376  1152 -6378 0
 6374  6375  6376  1152  6379 0

c  -1-1 --> -2
c    ( b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧  b^{2, 576}_0 ∧ -p_1152) -> ( b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0)
c  in CNF:
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨  b^{2, 577}_2
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨  b^{2, 577}_1
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨  p_1152 ∨ -b^{2, 577}_0
c  in DIMACS:
-6374  6375 -6376  1152  6377 0
-6374  6375 -6376  1152  6378 0
-6374  6375 -6376  1152 -6379 0

c  -2-1 --> break 
c    ( b^{2, 576}_2 ∧  b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨  b^{2, 576}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-6374 -6375  6376  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 576}_2 ∧ -b^{2, 576}_1 ∧ -b^{2, 576}_0 ∧ true) 
c  in CNF:
c    -b^{2, 576}_2 ∨  b^{2, 576}_1 ∨  b^{2, 576}_0 ∨ false 
c  in DIMACS:
-6374  6375  6376  0

c  3 does not represent an automaton state.
c    -(-b^{2, 576}_2 ∧  b^{2, 576}_1 ∧  b^{2, 576}_0 ∧ true) 
c  in CNF:
c     b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ false 
c  in DIMACS:
 6374 -6375 -6376  0
c  -3 does not represent an automaton state.
c    -( b^{2, 576}_2 ∧  b^{2, 576}_1 ∧  b^{2, 576}_0 ∧ true) 
c  in CNF:
c    -b^{2, 576}_2 ∨ -b^{2, 576}_1 ∨ -b^{2, 576}_0 ∨ false 
c  in DIMACS:
-6374 -6375 -6376  0

c i = 577
c  -2+1 --> -1
c    ( b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧  p_1154) -> ( b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0)
c  in CNF:
c    -b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨  b^{2, 578}_2
c    -b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_1
c    -b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨  b^{2, 578}_0
c  in DIMACS:
-6377 -6378  6379 -1154  6380 0
-6377 -6378  6379 -1154 -6381 0
-6377 -6378  6379 -1154  6382 0

c  -1+1 --> 0
c    ( b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0 ∧  p_1154) -> (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧ -b^{2, 578}_0)
c  in CNF:
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_2
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_1
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_0
c  in DIMACS:
-6377  6378 -6379 -1154 -6380 0
-6377  6378 -6379 -1154 -6381 0
-6377  6378 -6379 -1154 -6382 0

c  0+1 --> 1
c    (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧  p_1154) -> (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0)
c  in CNF:
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_2
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_1
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨  b^{2, 578}_0
c  in DIMACS:
 6377  6378  6379 -1154 -6380 0
 6377  6378  6379 -1154 -6381 0
 6377  6378  6379 -1154  6382 0

c  1+1 --> 2
c    (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0 ∧  p_1154) -> (-b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0)
c  in CNF:
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_2
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨  b^{2, 578}_1
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ -p_1154 ∨ -b^{2, 578}_0
c  in DIMACS:
 6377  6378 -6379 -1154 -6380 0
 6377  6378 -6379 -1154  6381 0
 6377  6378 -6379 -1154 -6382 0

c  2+1 --> break 
c    (-b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧  p_1154) -> break
c  in CNF:
c     b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ -p_1154 ∨ break
c  in DIMACS:
 6377 -6378  6379 -1154 1162 0


c  2-1 --> 1
c    (-b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧ -p_1154) -> (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0)
c  in CNF:
c     b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_2
c     b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_1
c     b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨  b^{2, 578}_0
c  in DIMACS:
 6377 -6378  6379  1154 -6380 0
 6377 -6378  6379  1154 -6381 0
 6377 -6378  6379  1154  6382 0

c  1-1 --> 0
c    (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0 ∧ -p_1154) -> (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧ -b^{2, 578}_0)
c  in CNF:
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_2
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_1
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_0
c  in DIMACS:
 6377  6378 -6379  1154 -6380 0
 6377  6378 -6379  1154 -6381 0
 6377  6378 -6379  1154 -6382 0

c  0-1 --> -1
c    (-b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧ -p_1154) -> ( b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0)
c  in CNF:
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨  b^{2, 578}_2
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_1
c     b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨  b^{2, 578}_0
c  in DIMACS:
 6377  6378  6379  1154  6380 0
 6377  6378  6379  1154 -6381 0
 6377  6378  6379  1154  6382 0

c  -1-1 --> -2
c    ( b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧  b^{2, 577}_0 ∧ -p_1154) -> ( b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0)
c  in CNF:
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨  b^{2, 578}_2
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨  b^{2, 578}_1
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨  p_1154 ∨ -b^{2, 578}_0
c  in DIMACS:
-6377  6378 -6379  1154  6380 0
-6377  6378 -6379  1154  6381 0
-6377  6378 -6379  1154 -6382 0

c  -2-1 --> break 
c    ( b^{2, 577}_2 ∧  b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧ -p_1154) -> break
c  in CNF:
c    -b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨  b^{2, 577}_0 ∨  p_1154 ∨ break
c  in DIMACS:
-6377 -6378  6379  1154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 577}_2 ∧ -b^{2, 577}_1 ∧ -b^{2, 577}_0 ∧ true) 
c  in CNF:
c    -b^{2, 577}_2 ∨  b^{2, 577}_1 ∨  b^{2, 577}_0 ∨ false 
c  in DIMACS:
-6377  6378  6379  0

c  3 does not represent an automaton state.
c    -(-b^{2, 577}_2 ∧  b^{2, 577}_1 ∧  b^{2, 577}_0 ∧ true) 
c  in CNF:
c     b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ false 
c  in DIMACS:
 6377 -6378 -6379  0
c  -3 does not represent an automaton state.
c    -( b^{2, 577}_2 ∧  b^{2, 577}_1 ∧  b^{2, 577}_0 ∧ true) 
c  in CNF:
c    -b^{2, 577}_2 ∨ -b^{2, 577}_1 ∨ -b^{2, 577}_0 ∨ false 
c  in DIMACS:
-6377 -6378 -6379  0

c i = 578
c  -2+1 --> -1
c    ( b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧  p_1156) -> ( b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0)
c  in CNF:
c    -b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨  b^{2, 579}_2
c    -b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_1
c    -b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨  b^{2, 579}_0
c  in DIMACS:
-6380 -6381  6382 -1156  6383 0
-6380 -6381  6382 -1156 -6384 0
-6380 -6381  6382 -1156  6385 0

c  -1+1 --> 0
c    ( b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0 ∧  p_1156) -> (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧ -b^{2, 579}_0)
c  in CNF:
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_2
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_1
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_0
c  in DIMACS:
-6380  6381 -6382 -1156 -6383 0
-6380  6381 -6382 -1156 -6384 0
-6380  6381 -6382 -1156 -6385 0

c  0+1 --> 1
c    (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧  p_1156) -> (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0)
c  in CNF:
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_2
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_1
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨  b^{2, 579}_0
c  in DIMACS:
 6380  6381  6382 -1156 -6383 0
 6380  6381  6382 -1156 -6384 0
 6380  6381  6382 -1156  6385 0

c  1+1 --> 2
c    (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0 ∧  p_1156) -> (-b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0)
c  in CNF:
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_2
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨  b^{2, 579}_1
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ -p_1156 ∨ -b^{2, 579}_0
c  in DIMACS:
 6380  6381 -6382 -1156 -6383 0
 6380  6381 -6382 -1156  6384 0
 6380  6381 -6382 -1156 -6385 0

c  2+1 --> break 
c    (-b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 6380 -6381  6382 -1156 1162 0


c  2-1 --> 1
c    (-b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧ -p_1156) -> (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0)
c  in CNF:
c     b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_2
c     b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_1
c     b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨  b^{2, 579}_0
c  in DIMACS:
 6380 -6381  6382  1156 -6383 0
 6380 -6381  6382  1156 -6384 0
 6380 -6381  6382  1156  6385 0

c  1-1 --> 0
c    (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0 ∧ -p_1156) -> (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧ -b^{2, 579}_0)
c  in CNF:
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_2
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_1
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_0
c  in DIMACS:
 6380  6381 -6382  1156 -6383 0
 6380  6381 -6382  1156 -6384 0
 6380  6381 -6382  1156 -6385 0

c  0-1 --> -1
c    (-b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧ -p_1156) -> ( b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0)
c  in CNF:
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨  b^{2, 579}_2
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_1
c     b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨  b^{2, 579}_0
c  in DIMACS:
 6380  6381  6382  1156  6383 0
 6380  6381  6382  1156 -6384 0
 6380  6381  6382  1156  6385 0

c  -1-1 --> -2
c    ( b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧  b^{2, 578}_0 ∧ -p_1156) -> ( b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0)
c  in CNF:
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨  b^{2, 579}_2
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨  b^{2, 579}_1
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨  p_1156 ∨ -b^{2, 579}_0
c  in DIMACS:
-6380  6381 -6382  1156  6383 0
-6380  6381 -6382  1156  6384 0
-6380  6381 -6382  1156 -6385 0

c  -2-1 --> break 
c    ( b^{2, 578}_2 ∧  b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨  b^{2, 578}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-6380 -6381  6382  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 578}_2 ∧ -b^{2, 578}_1 ∧ -b^{2, 578}_0 ∧ true) 
c  in CNF:
c    -b^{2, 578}_2 ∨  b^{2, 578}_1 ∨  b^{2, 578}_0 ∨ false 
c  in DIMACS:
-6380  6381  6382  0

c  3 does not represent an automaton state.
c    -(-b^{2, 578}_2 ∧  b^{2, 578}_1 ∧  b^{2, 578}_0 ∧ true) 
c  in CNF:
c     b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ false 
c  in DIMACS:
 6380 -6381 -6382  0
c  -3 does not represent an automaton state.
c    -( b^{2, 578}_2 ∧  b^{2, 578}_1 ∧  b^{2, 578}_0 ∧ true) 
c  in CNF:
c    -b^{2, 578}_2 ∨ -b^{2, 578}_1 ∨ -b^{2, 578}_0 ∨ false 
c  in DIMACS:
-6380 -6381 -6382  0

c i = 579
c  -2+1 --> -1
c    ( b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧  p_1158) -> ( b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0)
c  in CNF:
c    -b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨  b^{2, 580}_2
c    -b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_1
c    -b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨  b^{2, 580}_0
c  in DIMACS:
-6383 -6384  6385 -1158  6386 0
-6383 -6384  6385 -1158 -6387 0
-6383 -6384  6385 -1158  6388 0

c  -1+1 --> 0
c    ( b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0 ∧  p_1158) -> (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧ -b^{2, 580}_0)
c  in CNF:
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_2
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_1
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_0
c  in DIMACS:
-6383  6384 -6385 -1158 -6386 0
-6383  6384 -6385 -1158 -6387 0
-6383  6384 -6385 -1158 -6388 0

c  0+1 --> 1
c    (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧  p_1158) -> (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0)
c  in CNF:
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_2
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_1
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨  b^{2, 580}_0
c  in DIMACS:
 6383  6384  6385 -1158 -6386 0
 6383  6384  6385 -1158 -6387 0
 6383  6384  6385 -1158  6388 0

c  1+1 --> 2
c    (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0 ∧  p_1158) -> (-b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0)
c  in CNF:
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_2
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨  b^{2, 580}_1
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ -p_1158 ∨ -b^{2, 580}_0
c  in DIMACS:
 6383  6384 -6385 -1158 -6386 0
 6383  6384 -6385 -1158  6387 0
 6383  6384 -6385 -1158 -6388 0

c  2+1 --> break 
c    (-b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 6383 -6384  6385 -1158 1162 0


c  2-1 --> 1
c    (-b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧ -p_1158) -> (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0)
c  in CNF:
c     b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_2
c     b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_1
c     b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨  b^{2, 580}_0
c  in DIMACS:
 6383 -6384  6385  1158 -6386 0
 6383 -6384  6385  1158 -6387 0
 6383 -6384  6385  1158  6388 0

c  1-1 --> 0
c    (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0 ∧ -p_1158) -> (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧ -b^{2, 580}_0)
c  in CNF:
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_2
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_1
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_0
c  in DIMACS:
 6383  6384 -6385  1158 -6386 0
 6383  6384 -6385  1158 -6387 0
 6383  6384 -6385  1158 -6388 0

c  0-1 --> -1
c    (-b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧ -p_1158) -> ( b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0)
c  in CNF:
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨  b^{2, 580}_2
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_1
c     b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨  b^{2, 580}_0
c  in DIMACS:
 6383  6384  6385  1158  6386 0
 6383  6384  6385  1158 -6387 0
 6383  6384  6385  1158  6388 0

c  -1-1 --> -2
c    ( b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧  b^{2, 579}_0 ∧ -p_1158) -> ( b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0)
c  in CNF:
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨  b^{2, 580}_2
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨  b^{2, 580}_1
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨  p_1158 ∨ -b^{2, 580}_0
c  in DIMACS:
-6383  6384 -6385  1158  6386 0
-6383  6384 -6385  1158  6387 0
-6383  6384 -6385  1158 -6388 0

c  -2-1 --> break 
c    ( b^{2, 579}_2 ∧  b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨  b^{2, 579}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-6383 -6384  6385  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 579}_2 ∧ -b^{2, 579}_1 ∧ -b^{2, 579}_0 ∧ true) 
c  in CNF:
c    -b^{2, 579}_2 ∨  b^{2, 579}_1 ∨  b^{2, 579}_0 ∨ false 
c  in DIMACS:
-6383  6384  6385  0

c  3 does not represent an automaton state.
c    -(-b^{2, 579}_2 ∧  b^{2, 579}_1 ∧  b^{2, 579}_0 ∧ true) 
c  in CNF:
c     b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ false 
c  in DIMACS:
 6383 -6384 -6385  0
c  -3 does not represent an automaton state.
c    -( b^{2, 579}_2 ∧  b^{2, 579}_1 ∧  b^{2, 579}_0 ∧ true) 
c  in CNF:
c    -b^{2, 579}_2 ∨ -b^{2, 579}_1 ∨ -b^{2, 579}_0 ∨ false 
c  in DIMACS:
-6383 -6384 -6385  0

c i = 580
c  -2+1 --> -1
c    ( b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧  p_1160) -> ( b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧  b^{2, 581}_0)
c  in CNF:
c    -b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨  b^{2, 581}_2
c    -b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_1
c    -b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨  b^{2, 581}_0
c  in DIMACS:
-6386 -6387  6388 -1160  6389 0
-6386 -6387  6388 -1160 -6390 0
-6386 -6387  6388 -1160  6391 0

c  -1+1 --> 0
c    ( b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0 ∧  p_1160) -> (-b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧ -b^{2, 581}_0)
c  in CNF:
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_2
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_1
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_0
c  in DIMACS:
-6386  6387 -6388 -1160 -6389 0
-6386  6387 -6388 -1160 -6390 0
-6386  6387 -6388 -1160 -6391 0

c  0+1 --> 1
c    (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧  p_1160) -> (-b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧  b^{2, 581}_0)
c  in CNF:
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_2
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_1
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨  b^{2, 581}_0
c  in DIMACS:
 6386  6387  6388 -1160 -6389 0
 6386  6387  6388 -1160 -6390 0
 6386  6387  6388 -1160  6391 0

c  1+1 --> 2
c    (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0 ∧  p_1160) -> (-b^{2, 581}_2 ∧  b^{2, 581}_1 ∧ -b^{2, 581}_0)
c  in CNF:
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_2
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨  b^{2, 581}_1
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ -p_1160 ∨ -b^{2, 581}_0
c  in DIMACS:
 6386  6387 -6388 -1160 -6389 0
 6386  6387 -6388 -1160  6390 0
 6386  6387 -6388 -1160 -6391 0

c  2+1 --> break 
c    (-b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 6386 -6387  6388 -1160 1162 0


c  2-1 --> 1
c    (-b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧ -p_1160) -> (-b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧  b^{2, 581}_0)
c  in CNF:
c     b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_2
c     b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_1
c     b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨  b^{2, 581}_0
c  in DIMACS:
 6386 -6387  6388  1160 -6389 0
 6386 -6387  6388  1160 -6390 0
 6386 -6387  6388  1160  6391 0

c  1-1 --> 0
c    (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0 ∧ -p_1160) -> (-b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧ -b^{2, 581}_0)
c  in CNF:
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_2
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_1
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_0
c  in DIMACS:
 6386  6387 -6388  1160 -6389 0
 6386  6387 -6388  1160 -6390 0
 6386  6387 -6388  1160 -6391 0

c  0-1 --> -1
c    (-b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧ -p_1160) -> ( b^{2, 581}_2 ∧ -b^{2, 581}_1 ∧  b^{2, 581}_0)
c  in CNF:
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨  b^{2, 581}_2
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_1
c     b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨  b^{2, 581}_0
c  in DIMACS:
 6386  6387  6388  1160  6389 0
 6386  6387  6388  1160 -6390 0
 6386  6387  6388  1160  6391 0

c  -1-1 --> -2
c    ( b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧  b^{2, 580}_0 ∧ -p_1160) -> ( b^{2, 581}_2 ∧  b^{2, 581}_1 ∧ -b^{2, 581}_0)
c  in CNF:
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨  b^{2, 581}_2
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨  b^{2, 581}_1
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨  p_1160 ∨ -b^{2, 581}_0
c  in DIMACS:
-6386  6387 -6388  1160  6389 0
-6386  6387 -6388  1160  6390 0
-6386  6387 -6388  1160 -6391 0

c  -2-1 --> break 
c    ( b^{2, 580}_2 ∧  b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨  b^{2, 580}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-6386 -6387  6388  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{2, 580}_2 ∧ -b^{2, 580}_1 ∧ -b^{2, 580}_0 ∧ true) 
c  in CNF:
c    -b^{2, 580}_2 ∨  b^{2, 580}_1 ∨  b^{2, 580}_0 ∨ false 
c  in DIMACS:
-6386  6387  6388  0

c  3 does not represent an automaton state.
c    -(-b^{2, 580}_2 ∧  b^{2, 580}_1 ∧  b^{2, 580}_0 ∧ true) 
c  in CNF:
c     b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ false 
c  in DIMACS:
 6386 -6387 -6388  0
c  -3 does not represent an automaton state.
c    -( b^{2, 580}_2 ∧  b^{2, 580}_1 ∧  b^{2, 580}_0 ∧ true) 
c  in CNF:
c    -b^{2, 580}_2 ∨ -b^{2, 580}_1 ∨ -b^{2, 580}_0 ∨ false 
c  in DIMACS:
-6386 -6387 -6388  0

c INIT for k = 3
c    -b^{3, 1}_2
c    -b^{3, 1}_1
c    -b^{3, 1}_0
c  in DIMACS:
-6392 0
-6393 0
-6394 0

c Transitions for k = 3
c i = 1
c  -2+1 --> -1
c    ( b^{3, 1}_2 ∧  b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧  p_3) -> ( b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0)
c  in CNF:
c    -b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨  b^{3, 2}_2
c    -b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_1
c    -b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨  b^{3, 2}_0
c  in DIMACS:
-6392 -6393  6394 -3  6395 0
-6392 -6393  6394 -3 -6396 0
-6392 -6393  6394 -3  6397 0

c  -1+1 --> 0
c    ( b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧  b^{3, 1}_0 ∧  p_3) -> (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧ -b^{3, 2}_0)
c  in CNF:
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_2
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_1
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_0
c  in DIMACS:
-6392  6393 -6394 -3 -6395 0
-6392  6393 -6394 -3 -6396 0
-6392  6393 -6394 -3 -6397 0

c  0+1 --> 1
c    (-b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧  p_3) -> (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0)
c  in CNF:
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_2
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_1
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨  b^{3, 2}_0
c  in DIMACS:
 6392  6393  6394 -3 -6395 0
 6392  6393  6394 -3 -6396 0
 6392  6393  6394 -3  6397 0

c  1+1 --> 2
c    (-b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧  b^{3, 1}_0 ∧  p_3) -> (-b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0)
c  in CNF:
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_2
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨  b^{3, 2}_1
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ -p_3 ∨ -b^{3, 2}_0
c  in DIMACS:
 6392  6393 -6394 -3 -6395 0
 6392  6393 -6394 -3  6396 0
 6392  6393 -6394 -3 -6397 0

c  2+1 --> break 
c    (-b^{3, 1}_2 ∧  b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧  p_3) -> break
c  in CNF:
c     b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ -p_3 ∨ break
c  in DIMACS:
 6392 -6393  6394 -3 1162 0


c  2-1 --> 1
c    (-b^{3, 1}_2 ∧  b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧ -p_3) -> (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0)
c  in CNF:
c     b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_2
c     b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_1
c     b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨  b^{3, 2}_0
c  in DIMACS:
 6392 -6393  6394  3 -6395 0
 6392 -6393  6394  3 -6396 0
 6392 -6393  6394  3  6397 0

c  1-1 --> 0
c    (-b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧  b^{3, 1}_0 ∧ -p_3) -> (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧ -b^{3, 2}_0)
c  in CNF:
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_2
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_1
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_0
c  in DIMACS:
 6392  6393 -6394  3 -6395 0
 6392  6393 -6394  3 -6396 0
 6392  6393 -6394  3 -6397 0

c  0-1 --> -1
c    (-b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧ -p_3) -> ( b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0)
c  in CNF:
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨  b^{3, 2}_2
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_1
c     b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨  b^{3, 2}_0
c  in DIMACS:
 6392  6393  6394  3  6395 0
 6392  6393  6394  3 -6396 0
 6392  6393  6394  3  6397 0

c  -1-1 --> -2
c    ( b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧  b^{3, 1}_0 ∧ -p_3) -> ( b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0)
c  in CNF:
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨  b^{3, 2}_2
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨  b^{3, 2}_1
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨  p_3 ∨ -b^{3, 2}_0
c  in DIMACS:
-6392  6393 -6394  3  6395 0
-6392  6393 -6394  3  6396 0
-6392  6393 -6394  3 -6397 0

c  -2-1 --> break 
c    ( b^{3, 1}_2 ∧  b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧ -p_3) -> break
c  in CNF:
c    -b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨  b^{3, 1}_0 ∨  p_3 ∨ break
c  in DIMACS:
-6392 -6393  6394  3 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 1}_2 ∧ -b^{3, 1}_1 ∧ -b^{3, 1}_0 ∧ true) 
c  in CNF:
c    -b^{3, 1}_2 ∨  b^{3, 1}_1 ∨  b^{3, 1}_0 ∨ false 
c  in DIMACS:
-6392  6393  6394  0

c  3 does not represent an automaton state.
c    -(-b^{3, 1}_2 ∧  b^{3, 1}_1 ∧  b^{3, 1}_0 ∧ true) 
c  in CNF:
c     b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ false 
c  in DIMACS:
 6392 -6393 -6394  0
c  -3 does not represent an automaton state.
c    -( b^{3, 1}_2 ∧  b^{3, 1}_1 ∧  b^{3, 1}_0 ∧ true) 
c  in CNF:
c    -b^{3, 1}_2 ∨ -b^{3, 1}_1 ∨ -b^{3, 1}_0 ∨ false 
c  in DIMACS:
-6392 -6393 -6394  0

c i = 2
c  -2+1 --> -1
c    ( b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧  p_6) -> ( b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0)
c  in CNF:
c    -b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨  b^{3, 3}_2
c    -b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_1
c    -b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨  b^{3, 3}_0
c  in DIMACS:
-6395 -6396  6397 -6  6398 0
-6395 -6396  6397 -6 -6399 0
-6395 -6396  6397 -6  6400 0

c  -1+1 --> 0
c    ( b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0 ∧  p_6) -> (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧ -b^{3, 3}_0)
c  in CNF:
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_2
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_1
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_0
c  in DIMACS:
-6395  6396 -6397 -6 -6398 0
-6395  6396 -6397 -6 -6399 0
-6395  6396 -6397 -6 -6400 0

c  0+1 --> 1
c    (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧  p_6) -> (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0)
c  in CNF:
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_2
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_1
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨  b^{3, 3}_0
c  in DIMACS:
 6395  6396  6397 -6 -6398 0
 6395  6396  6397 -6 -6399 0
 6395  6396  6397 -6  6400 0

c  1+1 --> 2
c    (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0 ∧  p_6) -> (-b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0)
c  in CNF:
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_2
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨  b^{3, 3}_1
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ -p_6 ∨ -b^{3, 3}_0
c  in DIMACS:
 6395  6396 -6397 -6 -6398 0
 6395  6396 -6397 -6  6399 0
 6395  6396 -6397 -6 -6400 0

c  2+1 --> break 
c    (-b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧  p_6) -> break
c  in CNF:
c     b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ -p_6 ∨ break
c  in DIMACS:
 6395 -6396  6397 -6 1162 0


c  2-1 --> 1
c    (-b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧ -p_6) -> (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0)
c  in CNF:
c     b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_2
c     b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_1
c     b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨  b^{3, 3}_0
c  in DIMACS:
 6395 -6396  6397  6 -6398 0
 6395 -6396  6397  6 -6399 0
 6395 -6396  6397  6  6400 0

c  1-1 --> 0
c    (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0 ∧ -p_6) -> (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧ -b^{3, 3}_0)
c  in CNF:
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_2
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_1
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_0
c  in DIMACS:
 6395  6396 -6397  6 -6398 0
 6395  6396 -6397  6 -6399 0
 6395  6396 -6397  6 -6400 0

c  0-1 --> -1
c    (-b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧ -p_6) -> ( b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0)
c  in CNF:
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨  b^{3, 3}_2
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_1
c     b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨  b^{3, 3}_0
c  in DIMACS:
 6395  6396  6397  6  6398 0
 6395  6396  6397  6 -6399 0
 6395  6396  6397  6  6400 0

c  -1-1 --> -2
c    ( b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧  b^{3, 2}_0 ∧ -p_6) -> ( b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0)
c  in CNF:
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨  b^{3, 3}_2
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨  b^{3, 3}_1
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨  p_6 ∨ -b^{3, 3}_0
c  in DIMACS:
-6395  6396 -6397  6  6398 0
-6395  6396 -6397  6  6399 0
-6395  6396 -6397  6 -6400 0

c  -2-1 --> break 
c    ( b^{3, 2}_2 ∧  b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧ -p_6) -> break
c  in CNF:
c    -b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨  b^{3, 2}_0 ∨  p_6 ∨ break
c  in DIMACS:
-6395 -6396  6397  6 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 2}_2 ∧ -b^{3, 2}_1 ∧ -b^{3, 2}_0 ∧ true) 
c  in CNF:
c    -b^{3, 2}_2 ∨  b^{3, 2}_1 ∨  b^{3, 2}_0 ∨ false 
c  in DIMACS:
-6395  6396  6397  0

c  3 does not represent an automaton state.
c    -(-b^{3, 2}_2 ∧  b^{3, 2}_1 ∧  b^{3, 2}_0 ∧ true) 
c  in CNF:
c     b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ false 
c  in DIMACS:
 6395 -6396 -6397  0
c  -3 does not represent an automaton state.
c    -( b^{3, 2}_2 ∧  b^{3, 2}_1 ∧  b^{3, 2}_0 ∧ true) 
c  in CNF:
c    -b^{3, 2}_2 ∨ -b^{3, 2}_1 ∨ -b^{3, 2}_0 ∨ false 
c  in DIMACS:
-6395 -6396 -6397  0

c i = 3
c  -2+1 --> -1
c    ( b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧  p_9) -> ( b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0)
c  in CNF:
c    -b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨  b^{3, 4}_2
c    -b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_1
c    -b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨  b^{3, 4}_0
c  in DIMACS:
-6398 -6399  6400 -9  6401 0
-6398 -6399  6400 -9 -6402 0
-6398 -6399  6400 -9  6403 0

c  -1+1 --> 0
c    ( b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0 ∧  p_9) -> (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧ -b^{3, 4}_0)
c  in CNF:
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_2
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_1
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_0
c  in DIMACS:
-6398  6399 -6400 -9 -6401 0
-6398  6399 -6400 -9 -6402 0
-6398  6399 -6400 -9 -6403 0

c  0+1 --> 1
c    (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧  p_9) -> (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0)
c  in CNF:
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_2
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_1
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨  b^{3, 4}_0
c  in DIMACS:
 6398  6399  6400 -9 -6401 0
 6398  6399  6400 -9 -6402 0
 6398  6399  6400 -9  6403 0

c  1+1 --> 2
c    (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0 ∧  p_9) -> (-b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0)
c  in CNF:
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_2
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨  b^{3, 4}_1
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ -p_9 ∨ -b^{3, 4}_0
c  in DIMACS:
 6398  6399 -6400 -9 -6401 0
 6398  6399 -6400 -9  6402 0
 6398  6399 -6400 -9 -6403 0

c  2+1 --> break 
c    (-b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧  p_9) -> break
c  in CNF:
c     b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ -p_9 ∨ break
c  in DIMACS:
 6398 -6399  6400 -9 1162 0


c  2-1 --> 1
c    (-b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧ -p_9) -> (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0)
c  in CNF:
c     b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_2
c     b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_1
c     b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨  b^{3, 4}_0
c  in DIMACS:
 6398 -6399  6400  9 -6401 0
 6398 -6399  6400  9 -6402 0
 6398 -6399  6400  9  6403 0

c  1-1 --> 0
c    (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0 ∧ -p_9) -> (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧ -b^{3, 4}_0)
c  in CNF:
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_2
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_1
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_0
c  in DIMACS:
 6398  6399 -6400  9 -6401 0
 6398  6399 -6400  9 -6402 0
 6398  6399 -6400  9 -6403 0

c  0-1 --> -1
c    (-b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧ -p_9) -> ( b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0)
c  in CNF:
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨  b^{3, 4}_2
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_1
c     b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨  b^{3, 4}_0
c  in DIMACS:
 6398  6399  6400  9  6401 0
 6398  6399  6400  9 -6402 0
 6398  6399  6400  9  6403 0

c  -1-1 --> -2
c    ( b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧  b^{3, 3}_0 ∧ -p_9) -> ( b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0)
c  in CNF:
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨  b^{3, 4}_2
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨  b^{3, 4}_1
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨  p_9 ∨ -b^{3, 4}_0
c  in DIMACS:
-6398  6399 -6400  9  6401 0
-6398  6399 -6400  9  6402 0
-6398  6399 -6400  9 -6403 0

c  -2-1 --> break 
c    ( b^{3, 3}_2 ∧  b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧ -p_9) -> break
c  in CNF:
c    -b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨  b^{3, 3}_0 ∨  p_9 ∨ break
c  in DIMACS:
-6398 -6399  6400  9 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 3}_2 ∧ -b^{3, 3}_1 ∧ -b^{3, 3}_0 ∧ true) 
c  in CNF:
c    -b^{3, 3}_2 ∨  b^{3, 3}_1 ∨  b^{3, 3}_0 ∨ false 
c  in DIMACS:
-6398  6399  6400  0

c  3 does not represent an automaton state.
c    -(-b^{3, 3}_2 ∧  b^{3, 3}_1 ∧  b^{3, 3}_0 ∧ true) 
c  in CNF:
c     b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ false 
c  in DIMACS:
 6398 -6399 -6400  0
c  -3 does not represent an automaton state.
c    -( b^{3, 3}_2 ∧  b^{3, 3}_1 ∧  b^{3, 3}_0 ∧ true) 
c  in CNF:
c    -b^{3, 3}_2 ∨ -b^{3, 3}_1 ∨ -b^{3, 3}_0 ∨ false 
c  in DIMACS:
-6398 -6399 -6400  0

c i = 4
c  -2+1 --> -1
c    ( b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧  p_12) -> ( b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0)
c  in CNF:
c    -b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨  b^{3, 5}_2
c    -b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_1
c    -b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨  b^{3, 5}_0
c  in DIMACS:
-6401 -6402  6403 -12  6404 0
-6401 -6402  6403 -12 -6405 0
-6401 -6402  6403 -12  6406 0

c  -1+1 --> 0
c    ( b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0 ∧  p_12) -> (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧ -b^{3, 5}_0)
c  in CNF:
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_2
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_1
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_0
c  in DIMACS:
-6401  6402 -6403 -12 -6404 0
-6401  6402 -6403 -12 -6405 0
-6401  6402 -6403 -12 -6406 0

c  0+1 --> 1
c    (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧  p_12) -> (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0)
c  in CNF:
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_2
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_1
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨  b^{3, 5}_0
c  in DIMACS:
 6401  6402  6403 -12 -6404 0
 6401  6402  6403 -12 -6405 0
 6401  6402  6403 -12  6406 0

c  1+1 --> 2
c    (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0 ∧  p_12) -> (-b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0)
c  in CNF:
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_2
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨  b^{3, 5}_1
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ -p_12 ∨ -b^{3, 5}_0
c  in DIMACS:
 6401  6402 -6403 -12 -6404 0
 6401  6402 -6403 -12  6405 0
 6401  6402 -6403 -12 -6406 0

c  2+1 --> break 
c    (-b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧  p_12) -> break
c  in CNF:
c     b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 6401 -6402  6403 -12 1162 0


c  2-1 --> 1
c    (-b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧ -p_12) -> (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0)
c  in CNF:
c     b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_2
c     b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_1
c     b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨  b^{3, 5}_0
c  in DIMACS:
 6401 -6402  6403  12 -6404 0
 6401 -6402  6403  12 -6405 0
 6401 -6402  6403  12  6406 0

c  1-1 --> 0
c    (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0 ∧ -p_12) -> (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧ -b^{3, 5}_0)
c  in CNF:
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_2
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_1
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_0
c  in DIMACS:
 6401  6402 -6403  12 -6404 0
 6401  6402 -6403  12 -6405 0
 6401  6402 -6403  12 -6406 0

c  0-1 --> -1
c    (-b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧ -p_12) -> ( b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0)
c  in CNF:
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨  b^{3, 5}_2
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_1
c     b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨  b^{3, 5}_0
c  in DIMACS:
 6401  6402  6403  12  6404 0
 6401  6402  6403  12 -6405 0
 6401  6402  6403  12  6406 0

c  -1-1 --> -2
c    ( b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧  b^{3, 4}_0 ∧ -p_12) -> ( b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0)
c  in CNF:
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨  b^{3, 5}_2
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨  b^{3, 5}_1
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨  p_12 ∨ -b^{3, 5}_0
c  in DIMACS:
-6401  6402 -6403  12  6404 0
-6401  6402 -6403  12  6405 0
-6401  6402 -6403  12 -6406 0

c  -2-1 --> break 
c    ( b^{3, 4}_2 ∧  b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨  b^{3, 4}_0 ∨  p_12 ∨ break
c  in DIMACS:
-6401 -6402  6403  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 4}_2 ∧ -b^{3, 4}_1 ∧ -b^{3, 4}_0 ∧ true) 
c  in CNF:
c    -b^{3, 4}_2 ∨  b^{3, 4}_1 ∨  b^{3, 4}_0 ∨ false 
c  in DIMACS:
-6401  6402  6403  0

c  3 does not represent an automaton state.
c    -(-b^{3, 4}_2 ∧  b^{3, 4}_1 ∧  b^{3, 4}_0 ∧ true) 
c  in CNF:
c     b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ false 
c  in DIMACS:
 6401 -6402 -6403  0
c  -3 does not represent an automaton state.
c    -( b^{3, 4}_2 ∧  b^{3, 4}_1 ∧  b^{3, 4}_0 ∧ true) 
c  in CNF:
c    -b^{3, 4}_2 ∨ -b^{3, 4}_1 ∨ -b^{3, 4}_0 ∨ false 
c  in DIMACS:
-6401 -6402 -6403  0

c i = 5
c  -2+1 --> -1
c    ( b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧  p_15) -> ( b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0)
c  in CNF:
c    -b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨  b^{3, 6}_2
c    -b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_1
c    -b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨  b^{3, 6}_0
c  in DIMACS:
-6404 -6405  6406 -15  6407 0
-6404 -6405  6406 -15 -6408 0
-6404 -6405  6406 -15  6409 0

c  -1+1 --> 0
c    ( b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0 ∧  p_15) -> (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧ -b^{3, 6}_0)
c  in CNF:
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_2
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_1
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_0
c  in DIMACS:
-6404  6405 -6406 -15 -6407 0
-6404  6405 -6406 -15 -6408 0
-6404  6405 -6406 -15 -6409 0

c  0+1 --> 1
c    (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧  p_15) -> (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0)
c  in CNF:
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_2
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_1
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨  b^{3, 6}_0
c  in DIMACS:
 6404  6405  6406 -15 -6407 0
 6404  6405  6406 -15 -6408 0
 6404  6405  6406 -15  6409 0

c  1+1 --> 2
c    (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0 ∧  p_15) -> (-b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0)
c  in CNF:
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_2
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨  b^{3, 6}_1
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ -p_15 ∨ -b^{3, 6}_0
c  in DIMACS:
 6404  6405 -6406 -15 -6407 0
 6404  6405 -6406 -15  6408 0
 6404  6405 -6406 -15 -6409 0

c  2+1 --> break 
c    (-b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧  p_15) -> break
c  in CNF:
c     b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ -p_15 ∨ break
c  in DIMACS:
 6404 -6405  6406 -15 1162 0


c  2-1 --> 1
c    (-b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧ -p_15) -> (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0)
c  in CNF:
c     b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_2
c     b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_1
c     b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨  b^{3, 6}_0
c  in DIMACS:
 6404 -6405  6406  15 -6407 0
 6404 -6405  6406  15 -6408 0
 6404 -6405  6406  15  6409 0

c  1-1 --> 0
c    (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0 ∧ -p_15) -> (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧ -b^{3, 6}_0)
c  in CNF:
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_2
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_1
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_0
c  in DIMACS:
 6404  6405 -6406  15 -6407 0
 6404  6405 -6406  15 -6408 0
 6404  6405 -6406  15 -6409 0

c  0-1 --> -1
c    (-b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧ -p_15) -> ( b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0)
c  in CNF:
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨  b^{3, 6}_2
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_1
c     b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨  b^{3, 6}_0
c  in DIMACS:
 6404  6405  6406  15  6407 0
 6404  6405  6406  15 -6408 0
 6404  6405  6406  15  6409 0

c  -1-1 --> -2
c    ( b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧  b^{3, 5}_0 ∧ -p_15) -> ( b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0)
c  in CNF:
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨  b^{3, 6}_2
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨  b^{3, 6}_1
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨  p_15 ∨ -b^{3, 6}_0
c  in DIMACS:
-6404  6405 -6406  15  6407 0
-6404  6405 -6406  15  6408 0
-6404  6405 -6406  15 -6409 0

c  -2-1 --> break 
c    ( b^{3, 5}_2 ∧  b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧ -p_15) -> break
c  in CNF:
c    -b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨  b^{3, 5}_0 ∨  p_15 ∨ break
c  in DIMACS:
-6404 -6405  6406  15 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 5}_2 ∧ -b^{3, 5}_1 ∧ -b^{3, 5}_0 ∧ true) 
c  in CNF:
c    -b^{3, 5}_2 ∨  b^{3, 5}_1 ∨  b^{3, 5}_0 ∨ false 
c  in DIMACS:
-6404  6405  6406  0

c  3 does not represent an automaton state.
c    -(-b^{3, 5}_2 ∧  b^{3, 5}_1 ∧  b^{3, 5}_0 ∧ true) 
c  in CNF:
c     b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ false 
c  in DIMACS:
 6404 -6405 -6406  0
c  -3 does not represent an automaton state.
c    -( b^{3, 5}_2 ∧  b^{3, 5}_1 ∧  b^{3, 5}_0 ∧ true) 
c  in CNF:
c    -b^{3, 5}_2 ∨ -b^{3, 5}_1 ∨ -b^{3, 5}_0 ∨ false 
c  in DIMACS:
-6404 -6405 -6406  0

c i = 6
c  -2+1 --> -1
c    ( b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧  p_18) -> ( b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0)
c  in CNF:
c    -b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨  b^{3, 7}_2
c    -b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_1
c    -b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨  b^{3, 7}_0
c  in DIMACS:
-6407 -6408  6409 -18  6410 0
-6407 -6408  6409 -18 -6411 0
-6407 -6408  6409 -18  6412 0

c  -1+1 --> 0
c    ( b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0 ∧  p_18) -> (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧ -b^{3, 7}_0)
c  in CNF:
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_2
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_1
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_0
c  in DIMACS:
-6407  6408 -6409 -18 -6410 0
-6407  6408 -6409 -18 -6411 0
-6407  6408 -6409 -18 -6412 0

c  0+1 --> 1
c    (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧  p_18) -> (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0)
c  in CNF:
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_2
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_1
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨  b^{3, 7}_0
c  in DIMACS:
 6407  6408  6409 -18 -6410 0
 6407  6408  6409 -18 -6411 0
 6407  6408  6409 -18  6412 0

c  1+1 --> 2
c    (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0 ∧  p_18) -> (-b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0)
c  in CNF:
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_2
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨  b^{3, 7}_1
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ -p_18 ∨ -b^{3, 7}_0
c  in DIMACS:
 6407  6408 -6409 -18 -6410 0
 6407  6408 -6409 -18  6411 0
 6407  6408 -6409 -18 -6412 0

c  2+1 --> break 
c    (-b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧  p_18) -> break
c  in CNF:
c     b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 6407 -6408  6409 -18 1162 0


c  2-1 --> 1
c    (-b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧ -p_18) -> (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0)
c  in CNF:
c     b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_2
c     b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_1
c     b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨  b^{3, 7}_0
c  in DIMACS:
 6407 -6408  6409  18 -6410 0
 6407 -6408  6409  18 -6411 0
 6407 -6408  6409  18  6412 0

c  1-1 --> 0
c    (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0 ∧ -p_18) -> (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧ -b^{3, 7}_0)
c  in CNF:
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_2
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_1
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_0
c  in DIMACS:
 6407  6408 -6409  18 -6410 0
 6407  6408 -6409  18 -6411 0
 6407  6408 -6409  18 -6412 0

c  0-1 --> -1
c    (-b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧ -p_18) -> ( b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0)
c  in CNF:
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨  b^{3, 7}_2
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_1
c     b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨  b^{3, 7}_0
c  in DIMACS:
 6407  6408  6409  18  6410 0
 6407  6408  6409  18 -6411 0
 6407  6408  6409  18  6412 0

c  -1-1 --> -2
c    ( b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧  b^{3, 6}_0 ∧ -p_18) -> ( b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0)
c  in CNF:
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨  b^{3, 7}_2
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨  b^{3, 7}_1
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨  p_18 ∨ -b^{3, 7}_0
c  in DIMACS:
-6407  6408 -6409  18  6410 0
-6407  6408 -6409  18  6411 0
-6407  6408 -6409  18 -6412 0

c  -2-1 --> break 
c    ( b^{3, 6}_2 ∧  b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨  b^{3, 6}_0 ∨  p_18 ∨ break
c  in DIMACS:
-6407 -6408  6409  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 6}_2 ∧ -b^{3, 6}_1 ∧ -b^{3, 6}_0 ∧ true) 
c  in CNF:
c    -b^{3, 6}_2 ∨  b^{3, 6}_1 ∨  b^{3, 6}_0 ∨ false 
c  in DIMACS:
-6407  6408  6409  0

c  3 does not represent an automaton state.
c    -(-b^{3, 6}_2 ∧  b^{3, 6}_1 ∧  b^{3, 6}_0 ∧ true) 
c  in CNF:
c     b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ false 
c  in DIMACS:
 6407 -6408 -6409  0
c  -3 does not represent an automaton state.
c    -( b^{3, 6}_2 ∧  b^{3, 6}_1 ∧  b^{3, 6}_0 ∧ true) 
c  in CNF:
c    -b^{3, 6}_2 ∨ -b^{3, 6}_1 ∨ -b^{3, 6}_0 ∨ false 
c  in DIMACS:
-6407 -6408 -6409  0

c i = 7
c  -2+1 --> -1
c    ( b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧  p_21) -> ( b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0)
c  in CNF:
c    -b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨  b^{3, 8}_2
c    -b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_1
c    -b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨  b^{3, 8}_0
c  in DIMACS:
-6410 -6411  6412 -21  6413 0
-6410 -6411  6412 -21 -6414 0
-6410 -6411  6412 -21  6415 0

c  -1+1 --> 0
c    ( b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0 ∧  p_21) -> (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧ -b^{3, 8}_0)
c  in CNF:
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_2
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_1
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_0
c  in DIMACS:
-6410  6411 -6412 -21 -6413 0
-6410  6411 -6412 -21 -6414 0
-6410  6411 -6412 -21 -6415 0

c  0+1 --> 1
c    (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧  p_21) -> (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0)
c  in CNF:
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_2
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_1
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨  b^{3, 8}_0
c  in DIMACS:
 6410  6411  6412 -21 -6413 0
 6410  6411  6412 -21 -6414 0
 6410  6411  6412 -21  6415 0

c  1+1 --> 2
c    (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0 ∧  p_21) -> (-b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0)
c  in CNF:
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_2
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨  b^{3, 8}_1
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ -p_21 ∨ -b^{3, 8}_0
c  in DIMACS:
 6410  6411 -6412 -21 -6413 0
 6410  6411 -6412 -21  6414 0
 6410  6411 -6412 -21 -6415 0

c  2+1 --> break 
c    (-b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧  p_21) -> break
c  in CNF:
c     b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ -p_21 ∨ break
c  in DIMACS:
 6410 -6411  6412 -21 1162 0


c  2-1 --> 1
c    (-b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧ -p_21) -> (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0)
c  in CNF:
c     b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_2
c     b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_1
c     b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨  b^{3, 8}_0
c  in DIMACS:
 6410 -6411  6412  21 -6413 0
 6410 -6411  6412  21 -6414 0
 6410 -6411  6412  21  6415 0

c  1-1 --> 0
c    (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0 ∧ -p_21) -> (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧ -b^{3, 8}_0)
c  in CNF:
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_2
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_1
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_0
c  in DIMACS:
 6410  6411 -6412  21 -6413 0
 6410  6411 -6412  21 -6414 0
 6410  6411 -6412  21 -6415 0

c  0-1 --> -1
c    (-b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧ -p_21) -> ( b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0)
c  in CNF:
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨  b^{3, 8}_2
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_1
c     b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨  b^{3, 8}_0
c  in DIMACS:
 6410  6411  6412  21  6413 0
 6410  6411  6412  21 -6414 0
 6410  6411  6412  21  6415 0

c  -1-1 --> -2
c    ( b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧  b^{3, 7}_0 ∧ -p_21) -> ( b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0)
c  in CNF:
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨  b^{3, 8}_2
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨  b^{3, 8}_1
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨  p_21 ∨ -b^{3, 8}_0
c  in DIMACS:
-6410  6411 -6412  21  6413 0
-6410  6411 -6412  21  6414 0
-6410  6411 -6412  21 -6415 0

c  -2-1 --> break 
c    ( b^{3, 7}_2 ∧  b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧ -p_21) -> break
c  in CNF:
c    -b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨  b^{3, 7}_0 ∨  p_21 ∨ break
c  in DIMACS:
-6410 -6411  6412  21 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 7}_2 ∧ -b^{3, 7}_1 ∧ -b^{3, 7}_0 ∧ true) 
c  in CNF:
c    -b^{3, 7}_2 ∨  b^{3, 7}_1 ∨  b^{3, 7}_0 ∨ false 
c  in DIMACS:
-6410  6411  6412  0

c  3 does not represent an automaton state.
c    -(-b^{3, 7}_2 ∧  b^{3, 7}_1 ∧  b^{3, 7}_0 ∧ true) 
c  in CNF:
c     b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ false 
c  in DIMACS:
 6410 -6411 -6412  0
c  -3 does not represent an automaton state.
c    -( b^{3, 7}_2 ∧  b^{3, 7}_1 ∧  b^{3, 7}_0 ∧ true) 
c  in CNF:
c    -b^{3, 7}_2 ∨ -b^{3, 7}_1 ∨ -b^{3, 7}_0 ∨ false 
c  in DIMACS:
-6410 -6411 -6412  0

c i = 8
c  -2+1 --> -1
c    ( b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧  p_24) -> ( b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0)
c  in CNF:
c    -b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨  b^{3, 9}_2
c    -b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_1
c    -b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨  b^{3, 9}_0
c  in DIMACS:
-6413 -6414  6415 -24  6416 0
-6413 -6414  6415 -24 -6417 0
-6413 -6414  6415 -24  6418 0

c  -1+1 --> 0
c    ( b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0 ∧  p_24) -> (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧ -b^{3, 9}_0)
c  in CNF:
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_2
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_1
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_0
c  in DIMACS:
-6413  6414 -6415 -24 -6416 0
-6413  6414 -6415 -24 -6417 0
-6413  6414 -6415 -24 -6418 0

c  0+1 --> 1
c    (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧  p_24) -> (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0)
c  in CNF:
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_2
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_1
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨  b^{3, 9}_0
c  in DIMACS:
 6413  6414  6415 -24 -6416 0
 6413  6414  6415 -24 -6417 0
 6413  6414  6415 -24  6418 0

c  1+1 --> 2
c    (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0 ∧  p_24) -> (-b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0)
c  in CNF:
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_2
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨  b^{3, 9}_1
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ -p_24 ∨ -b^{3, 9}_0
c  in DIMACS:
 6413  6414 -6415 -24 -6416 0
 6413  6414 -6415 -24  6417 0
 6413  6414 -6415 -24 -6418 0

c  2+1 --> break 
c    (-b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧  p_24) -> break
c  in CNF:
c     b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 6413 -6414  6415 -24 1162 0


c  2-1 --> 1
c    (-b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧ -p_24) -> (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0)
c  in CNF:
c     b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_2
c     b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_1
c     b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨  b^{3, 9}_0
c  in DIMACS:
 6413 -6414  6415  24 -6416 0
 6413 -6414  6415  24 -6417 0
 6413 -6414  6415  24  6418 0

c  1-1 --> 0
c    (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0 ∧ -p_24) -> (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧ -b^{3, 9}_0)
c  in CNF:
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_2
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_1
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_0
c  in DIMACS:
 6413  6414 -6415  24 -6416 0
 6413  6414 -6415  24 -6417 0
 6413  6414 -6415  24 -6418 0

c  0-1 --> -1
c    (-b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧ -p_24) -> ( b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0)
c  in CNF:
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨  b^{3, 9}_2
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_1
c     b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨  b^{3, 9}_0
c  in DIMACS:
 6413  6414  6415  24  6416 0
 6413  6414  6415  24 -6417 0
 6413  6414  6415  24  6418 0

c  -1-1 --> -2
c    ( b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧  b^{3, 8}_0 ∧ -p_24) -> ( b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0)
c  in CNF:
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨  b^{3, 9}_2
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨  b^{3, 9}_1
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨  p_24 ∨ -b^{3, 9}_0
c  in DIMACS:
-6413  6414 -6415  24  6416 0
-6413  6414 -6415  24  6417 0
-6413  6414 -6415  24 -6418 0

c  -2-1 --> break 
c    ( b^{3, 8}_2 ∧  b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨  b^{3, 8}_0 ∨  p_24 ∨ break
c  in DIMACS:
-6413 -6414  6415  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 8}_2 ∧ -b^{3, 8}_1 ∧ -b^{3, 8}_0 ∧ true) 
c  in CNF:
c    -b^{3, 8}_2 ∨  b^{3, 8}_1 ∨  b^{3, 8}_0 ∨ false 
c  in DIMACS:
-6413  6414  6415  0

c  3 does not represent an automaton state.
c    -(-b^{3, 8}_2 ∧  b^{3, 8}_1 ∧  b^{3, 8}_0 ∧ true) 
c  in CNF:
c     b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ false 
c  in DIMACS:
 6413 -6414 -6415  0
c  -3 does not represent an automaton state.
c    -( b^{3, 8}_2 ∧  b^{3, 8}_1 ∧  b^{3, 8}_0 ∧ true) 
c  in CNF:
c    -b^{3, 8}_2 ∨ -b^{3, 8}_1 ∨ -b^{3, 8}_0 ∨ false 
c  in DIMACS:
-6413 -6414 -6415  0

c i = 9
c  -2+1 --> -1
c    ( b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧  p_27) -> ( b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0)
c  in CNF:
c    -b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨  b^{3, 10}_2
c    -b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_1
c    -b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨  b^{3, 10}_0
c  in DIMACS:
-6416 -6417  6418 -27  6419 0
-6416 -6417  6418 -27 -6420 0
-6416 -6417  6418 -27  6421 0

c  -1+1 --> 0
c    ( b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0 ∧  p_27) -> (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧ -b^{3, 10}_0)
c  in CNF:
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_2
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_1
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_0
c  in DIMACS:
-6416  6417 -6418 -27 -6419 0
-6416  6417 -6418 -27 -6420 0
-6416  6417 -6418 -27 -6421 0

c  0+1 --> 1
c    (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧  p_27) -> (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0)
c  in CNF:
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_2
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_1
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨  b^{3, 10}_0
c  in DIMACS:
 6416  6417  6418 -27 -6419 0
 6416  6417  6418 -27 -6420 0
 6416  6417  6418 -27  6421 0

c  1+1 --> 2
c    (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0 ∧  p_27) -> (-b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0)
c  in CNF:
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_2
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨  b^{3, 10}_1
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ -p_27 ∨ -b^{3, 10}_0
c  in DIMACS:
 6416  6417 -6418 -27 -6419 0
 6416  6417 -6418 -27  6420 0
 6416  6417 -6418 -27 -6421 0

c  2+1 --> break 
c    (-b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧  p_27) -> break
c  in CNF:
c     b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ -p_27 ∨ break
c  in DIMACS:
 6416 -6417  6418 -27 1162 0


c  2-1 --> 1
c    (-b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧ -p_27) -> (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0)
c  in CNF:
c     b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_2
c     b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_1
c     b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨  b^{3, 10}_0
c  in DIMACS:
 6416 -6417  6418  27 -6419 0
 6416 -6417  6418  27 -6420 0
 6416 -6417  6418  27  6421 0

c  1-1 --> 0
c    (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0 ∧ -p_27) -> (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧ -b^{3, 10}_0)
c  in CNF:
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_2
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_1
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_0
c  in DIMACS:
 6416  6417 -6418  27 -6419 0
 6416  6417 -6418  27 -6420 0
 6416  6417 -6418  27 -6421 0

c  0-1 --> -1
c    (-b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧ -p_27) -> ( b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0)
c  in CNF:
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨  b^{3, 10}_2
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_1
c     b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨  b^{3, 10}_0
c  in DIMACS:
 6416  6417  6418  27  6419 0
 6416  6417  6418  27 -6420 0
 6416  6417  6418  27  6421 0

c  -1-1 --> -2
c    ( b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧  b^{3, 9}_0 ∧ -p_27) -> ( b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0)
c  in CNF:
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨  b^{3, 10}_2
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨  b^{3, 10}_1
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨  p_27 ∨ -b^{3, 10}_0
c  in DIMACS:
-6416  6417 -6418  27  6419 0
-6416  6417 -6418  27  6420 0
-6416  6417 -6418  27 -6421 0

c  -2-1 --> break 
c    ( b^{3, 9}_2 ∧  b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧ -p_27) -> break
c  in CNF:
c    -b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨  b^{3, 9}_0 ∨  p_27 ∨ break
c  in DIMACS:
-6416 -6417  6418  27 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 9}_2 ∧ -b^{3, 9}_1 ∧ -b^{3, 9}_0 ∧ true) 
c  in CNF:
c    -b^{3, 9}_2 ∨  b^{3, 9}_1 ∨  b^{3, 9}_0 ∨ false 
c  in DIMACS:
-6416  6417  6418  0

c  3 does not represent an automaton state.
c    -(-b^{3, 9}_2 ∧  b^{3, 9}_1 ∧  b^{3, 9}_0 ∧ true) 
c  in CNF:
c     b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ false 
c  in DIMACS:
 6416 -6417 -6418  0
c  -3 does not represent an automaton state.
c    -( b^{3, 9}_2 ∧  b^{3, 9}_1 ∧  b^{3, 9}_0 ∧ true) 
c  in CNF:
c    -b^{3, 9}_2 ∨ -b^{3, 9}_1 ∨ -b^{3, 9}_0 ∨ false 
c  in DIMACS:
-6416 -6417 -6418  0

c i = 10
c  -2+1 --> -1
c    ( b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧  p_30) -> ( b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0)
c  in CNF:
c    -b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨  b^{3, 11}_2
c    -b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_1
c    -b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨  b^{3, 11}_0
c  in DIMACS:
-6419 -6420  6421 -30  6422 0
-6419 -6420  6421 -30 -6423 0
-6419 -6420  6421 -30  6424 0

c  -1+1 --> 0
c    ( b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0 ∧  p_30) -> (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧ -b^{3, 11}_0)
c  in CNF:
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_2
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_1
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_0
c  in DIMACS:
-6419  6420 -6421 -30 -6422 0
-6419  6420 -6421 -30 -6423 0
-6419  6420 -6421 -30 -6424 0

c  0+1 --> 1
c    (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧  p_30) -> (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0)
c  in CNF:
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_2
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_1
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨  b^{3, 11}_0
c  in DIMACS:
 6419  6420  6421 -30 -6422 0
 6419  6420  6421 -30 -6423 0
 6419  6420  6421 -30  6424 0

c  1+1 --> 2
c    (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0 ∧  p_30) -> (-b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0)
c  in CNF:
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_2
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨  b^{3, 11}_1
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ -p_30 ∨ -b^{3, 11}_0
c  in DIMACS:
 6419  6420 -6421 -30 -6422 0
 6419  6420 -6421 -30  6423 0
 6419  6420 -6421 -30 -6424 0

c  2+1 --> break 
c    (-b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧  p_30) -> break
c  in CNF:
c     b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 6419 -6420  6421 -30 1162 0


c  2-1 --> 1
c    (-b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧ -p_30) -> (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0)
c  in CNF:
c     b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_2
c     b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_1
c     b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨  b^{3, 11}_0
c  in DIMACS:
 6419 -6420  6421  30 -6422 0
 6419 -6420  6421  30 -6423 0
 6419 -6420  6421  30  6424 0

c  1-1 --> 0
c    (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0 ∧ -p_30) -> (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧ -b^{3, 11}_0)
c  in CNF:
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_2
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_1
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_0
c  in DIMACS:
 6419  6420 -6421  30 -6422 0
 6419  6420 -6421  30 -6423 0
 6419  6420 -6421  30 -6424 0

c  0-1 --> -1
c    (-b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧ -p_30) -> ( b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0)
c  in CNF:
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨  b^{3, 11}_2
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_1
c     b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨  b^{3, 11}_0
c  in DIMACS:
 6419  6420  6421  30  6422 0
 6419  6420  6421  30 -6423 0
 6419  6420  6421  30  6424 0

c  -1-1 --> -2
c    ( b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧  b^{3, 10}_0 ∧ -p_30) -> ( b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0)
c  in CNF:
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨  b^{3, 11}_2
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨  b^{3, 11}_1
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨  p_30 ∨ -b^{3, 11}_0
c  in DIMACS:
-6419  6420 -6421  30  6422 0
-6419  6420 -6421  30  6423 0
-6419  6420 -6421  30 -6424 0

c  -2-1 --> break 
c    ( b^{3, 10}_2 ∧  b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨  b^{3, 10}_0 ∨  p_30 ∨ break
c  in DIMACS:
-6419 -6420  6421  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 10}_2 ∧ -b^{3, 10}_1 ∧ -b^{3, 10}_0 ∧ true) 
c  in CNF:
c    -b^{3, 10}_2 ∨  b^{3, 10}_1 ∨  b^{3, 10}_0 ∨ false 
c  in DIMACS:
-6419  6420  6421  0

c  3 does not represent an automaton state.
c    -(-b^{3, 10}_2 ∧  b^{3, 10}_1 ∧  b^{3, 10}_0 ∧ true) 
c  in CNF:
c     b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ false 
c  in DIMACS:
 6419 -6420 -6421  0
c  -3 does not represent an automaton state.
c    -( b^{3, 10}_2 ∧  b^{3, 10}_1 ∧  b^{3, 10}_0 ∧ true) 
c  in CNF:
c    -b^{3, 10}_2 ∨ -b^{3, 10}_1 ∨ -b^{3, 10}_0 ∨ false 
c  in DIMACS:
-6419 -6420 -6421  0

c i = 11
c  -2+1 --> -1
c    ( b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧  p_33) -> ( b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0)
c  in CNF:
c    -b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨  b^{3, 12}_2
c    -b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_1
c    -b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨  b^{3, 12}_0
c  in DIMACS:
-6422 -6423  6424 -33  6425 0
-6422 -6423  6424 -33 -6426 0
-6422 -6423  6424 -33  6427 0

c  -1+1 --> 0
c    ( b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0 ∧  p_33) -> (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧ -b^{3, 12}_0)
c  in CNF:
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_2
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_1
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_0
c  in DIMACS:
-6422  6423 -6424 -33 -6425 0
-6422  6423 -6424 -33 -6426 0
-6422  6423 -6424 -33 -6427 0

c  0+1 --> 1
c    (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧  p_33) -> (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0)
c  in CNF:
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_2
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_1
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨  b^{3, 12}_0
c  in DIMACS:
 6422  6423  6424 -33 -6425 0
 6422  6423  6424 -33 -6426 0
 6422  6423  6424 -33  6427 0

c  1+1 --> 2
c    (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0 ∧  p_33) -> (-b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0)
c  in CNF:
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_2
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨  b^{3, 12}_1
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ -p_33 ∨ -b^{3, 12}_0
c  in DIMACS:
 6422  6423 -6424 -33 -6425 0
 6422  6423 -6424 -33  6426 0
 6422  6423 -6424 -33 -6427 0

c  2+1 --> break 
c    (-b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧  p_33) -> break
c  in CNF:
c     b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ -p_33 ∨ break
c  in DIMACS:
 6422 -6423  6424 -33 1162 0


c  2-1 --> 1
c    (-b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧ -p_33) -> (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0)
c  in CNF:
c     b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_2
c     b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_1
c     b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨  b^{3, 12}_0
c  in DIMACS:
 6422 -6423  6424  33 -6425 0
 6422 -6423  6424  33 -6426 0
 6422 -6423  6424  33  6427 0

c  1-1 --> 0
c    (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0 ∧ -p_33) -> (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧ -b^{3, 12}_0)
c  in CNF:
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_2
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_1
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_0
c  in DIMACS:
 6422  6423 -6424  33 -6425 0
 6422  6423 -6424  33 -6426 0
 6422  6423 -6424  33 -6427 0

c  0-1 --> -1
c    (-b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧ -p_33) -> ( b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0)
c  in CNF:
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨  b^{3, 12}_2
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_1
c     b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨  b^{3, 12}_0
c  in DIMACS:
 6422  6423  6424  33  6425 0
 6422  6423  6424  33 -6426 0
 6422  6423  6424  33  6427 0

c  -1-1 --> -2
c    ( b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧  b^{3, 11}_0 ∧ -p_33) -> ( b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0)
c  in CNF:
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨  b^{3, 12}_2
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨  b^{3, 12}_1
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨  p_33 ∨ -b^{3, 12}_0
c  in DIMACS:
-6422  6423 -6424  33  6425 0
-6422  6423 -6424  33  6426 0
-6422  6423 -6424  33 -6427 0

c  -2-1 --> break 
c    ( b^{3, 11}_2 ∧  b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧ -p_33) -> break
c  in CNF:
c    -b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨  b^{3, 11}_0 ∨  p_33 ∨ break
c  in DIMACS:
-6422 -6423  6424  33 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 11}_2 ∧ -b^{3, 11}_1 ∧ -b^{3, 11}_0 ∧ true) 
c  in CNF:
c    -b^{3, 11}_2 ∨  b^{3, 11}_1 ∨  b^{3, 11}_0 ∨ false 
c  in DIMACS:
-6422  6423  6424  0

c  3 does not represent an automaton state.
c    -(-b^{3, 11}_2 ∧  b^{3, 11}_1 ∧  b^{3, 11}_0 ∧ true) 
c  in CNF:
c     b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ false 
c  in DIMACS:
 6422 -6423 -6424  0
c  -3 does not represent an automaton state.
c    -( b^{3, 11}_2 ∧  b^{3, 11}_1 ∧  b^{3, 11}_0 ∧ true) 
c  in CNF:
c    -b^{3, 11}_2 ∨ -b^{3, 11}_1 ∨ -b^{3, 11}_0 ∨ false 
c  in DIMACS:
-6422 -6423 -6424  0

c i = 12
c  -2+1 --> -1
c    ( b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧  p_36) -> ( b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0)
c  in CNF:
c    -b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨  b^{3, 13}_2
c    -b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_1
c    -b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨  b^{3, 13}_0
c  in DIMACS:
-6425 -6426  6427 -36  6428 0
-6425 -6426  6427 -36 -6429 0
-6425 -6426  6427 -36  6430 0

c  -1+1 --> 0
c    ( b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0 ∧  p_36) -> (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧ -b^{3, 13}_0)
c  in CNF:
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_2
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_1
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_0
c  in DIMACS:
-6425  6426 -6427 -36 -6428 0
-6425  6426 -6427 -36 -6429 0
-6425  6426 -6427 -36 -6430 0

c  0+1 --> 1
c    (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧  p_36) -> (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0)
c  in CNF:
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_2
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_1
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨  b^{3, 13}_0
c  in DIMACS:
 6425  6426  6427 -36 -6428 0
 6425  6426  6427 -36 -6429 0
 6425  6426  6427 -36  6430 0

c  1+1 --> 2
c    (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0 ∧  p_36) -> (-b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0)
c  in CNF:
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_2
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨  b^{3, 13}_1
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ -p_36 ∨ -b^{3, 13}_0
c  in DIMACS:
 6425  6426 -6427 -36 -6428 0
 6425  6426 -6427 -36  6429 0
 6425  6426 -6427 -36 -6430 0

c  2+1 --> break 
c    (-b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧  p_36) -> break
c  in CNF:
c     b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 6425 -6426  6427 -36 1162 0


c  2-1 --> 1
c    (-b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧ -p_36) -> (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0)
c  in CNF:
c     b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_2
c     b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_1
c     b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨  b^{3, 13}_0
c  in DIMACS:
 6425 -6426  6427  36 -6428 0
 6425 -6426  6427  36 -6429 0
 6425 -6426  6427  36  6430 0

c  1-1 --> 0
c    (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0 ∧ -p_36) -> (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧ -b^{3, 13}_0)
c  in CNF:
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_2
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_1
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_0
c  in DIMACS:
 6425  6426 -6427  36 -6428 0
 6425  6426 -6427  36 -6429 0
 6425  6426 -6427  36 -6430 0

c  0-1 --> -1
c    (-b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧ -p_36) -> ( b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0)
c  in CNF:
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨  b^{3, 13}_2
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_1
c     b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨  b^{3, 13}_0
c  in DIMACS:
 6425  6426  6427  36  6428 0
 6425  6426  6427  36 -6429 0
 6425  6426  6427  36  6430 0

c  -1-1 --> -2
c    ( b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧  b^{3, 12}_0 ∧ -p_36) -> ( b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0)
c  in CNF:
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨  b^{3, 13}_2
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨  b^{3, 13}_1
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨  p_36 ∨ -b^{3, 13}_0
c  in DIMACS:
-6425  6426 -6427  36  6428 0
-6425  6426 -6427  36  6429 0
-6425  6426 -6427  36 -6430 0

c  -2-1 --> break 
c    ( b^{3, 12}_2 ∧  b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨  b^{3, 12}_0 ∨  p_36 ∨ break
c  in DIMACS:
-6425 -6426  6427  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 12}_2 ∧ -b^{3, 12}_1 ∧ -b^{3, 12}_0 ∧ true) 
c  in CNF:
c    -b^{3, 12}_2 ∨  b^{3, 12}_1 ∨  b^{3, 12}_0 ∨ false 
c  in DIMACS:
-6425  6426  6427  0

c  3 does not represent an automaton state.
c    -(-b^{3, 12}_2 ∧  b^{3, 12}_1 ∧  b^{3, 12}_0 ∧ true) 
c  in CNF:
c     b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ false 
c  in DIMACS:
 6425 -6426 -6427  0
c  -3 does not represent an automaton state.
c    -( b^{3, 12}_2 ∧  b^{3, 12}_1 ∧  b^{3, 12}_0 ∧ true) 
c  in CNF:
c    -b^{3, 12}_2 ∨ -b^{3, 12}_1 ∨ -b^{3, 12}_0 ∨ false 
c  in DIMACS:
-6425 -6426 -6427  0

c i = 13
c  -2+1 --> -1
c    ( b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧  p_39) -> ( b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0)
c  in CNF:
c    -b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨  b^{3, 14}_2
c    -b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_1
c    -b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨  b^{3, 14}_0
c  in DIMACS:
-6428 -6429  6430 -39  6431 0
-6428 -6429  6430 -39 -6432 0
-6428 -6429  6430 -39  6433 0

c  -1+1 --> 0
c    ( b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0 ∧  p_39) -> (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧ -b^{3, 14}_0)
c  in CNF:
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_2
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_1
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_0
c  in DIMACS:
-6428  6429 -6430 -39 -6431 0
-6428  6429 -6430 -39 -6432 0
-6428  6429 -6430 -39 -6433 0

c  0+1 --> 1
c    (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧  p_39) -> (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0)
c  in CNF:
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_2
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_1
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨  b^{3, 14}_0
c  in DIMACS:
 6428  6429  6430 -39 -6431 0
 6428  6429  6430 -39 -6432 0
 6428  6429  6430 -39  6433 0

c  1+1 --> 2
c    (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0 ∧  p_39) -> (-b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0)
c  in CNF:
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_2
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨  b^{3, 14}_1
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ -p_39 ∨ -b^{3, 14}_0
c  in DIMACS:
 6428  6429 -6430 -39 -6431 0
 6428  6429 -6430 -39  6432 0
 6428  6429 -6430 -39 -6433 0

c  2+1 --> break 
c    (-b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧  p_39) -> break
c  in CNF:
c     b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ -p_39 ∨ break
c  in DIMACS:
 6428 -6429  6430 -39 1162 0


c  2-1 --> 1
c    (-b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧ -p_39) -> (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0)
c  in CNF:
c     b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_2
c     b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_1
c     b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨  b^{3, 14}_0
c  in DIMACS:
 6428 -6429  6430  39 -6431 0
 6428 -6429  6430  39 -6432 0
 6428 -6429  6430  39  6433 0

c  1-1 --> 0
c    (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0 ∧ -p_39) -> (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧ -b^{3, 14}_0)
c  in CNF:
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_2
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_1
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_0
c  in DIMACS:
 6428  6429 -6430  39 -6431 0
 6428  6429 -6430  39 -6432 0
 6428  6429 -6430  39 -6433 0

c  0-1 --> -1
c    (-b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧ -p_39) -> ( b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0)
c  in CNF:
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨  b^{3, 14}_2
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_1
c     b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨  b^{3, 14}_0
c  in DIMACS:
 6428  6429  6430  39  6431 0
 6428  6429  6430  39 -6432 0
 6428  6429  6430  39  6433 0

c  -1-1 --> -2
c    ( b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧  b^{3, 13}_0 ∧ -p_39) -> ( b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0)
c  in CNF:
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨  b^{3, 14}_2
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨  b^{3, 14}_1
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨  p_39 ∨ -b^{3, 14}_0
c  in DIMACS:
-6428  6429 -6430  39  6431 0
-6428  6429 -6430  39  6432 0
-6428  6429 -6430  39 -6433 0

c  -2-1 --> break 
c    ( b^{3, 13}_2 ∧  b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧ -p_39) -> break
c  in CNF:
c    -b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨  b^{3, 13}_0 ∨  p_39 ∨ break
c  in DIMACS:
-6428 -6429  6430  39 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 13}_2 ∧ -b^{3, 13}_1 ∧ -b^{3, 13}_0 ∧ true) 
c  in CNF:
c    -b^{3, 13}_2 ∨  b^{3, 13}_1 ∨  b^{3, 13}_0 ∨ false 
c  in DIMACS:
-6428  6429  6430  0

c  3 does not represent an automaton state.
c    -(-b^{3, 13}_2 ∧  b^{3, 13}_1 ∧  b^{3, 13}_0 ∧ true) 
c  in CNF:
c     b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ false 
c  in DIMACS:
 6428 -6429 -6430  0
c  -3 does not represent an automaton state.
c    -( b^{3, 13}_2 ∧  b^{3, 13}_1 ∧  b^{3, 13}_0 ∧ true) 
c  in CNF:
c    -b^{3, 13}_2 ∨ -b^{3, 13}_1 ∨ -b^{3, 13}_0 ∨ false 
c  in DIMACS:
-6428 -6429 -6430  0

c i = 14
c  -2+1 --> -1
c    ( b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧  p_42) -> ( b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0)
c  in CNF:
c    -b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨  b^{3, 15}_2
c    -b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_1
c    -b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨  b^{3, 15}_0
c  in DIMACS:
-6431 -6432  6433 -42  6434 0
-6431 -6432  6433 -42 -6435 0
-6431 -6432  6433 -42  6436 0

c  -1+1 --> 0
c    ( b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0 ∧  p_42) -> (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧ -b^{3, 15}_0)
c  in CNF:
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_2
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_1
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_0
c  in DIMACS:
-6431  6432 -6433 -42 -6434 0
-6431  6432 -6433 -42 -6435 0
-6431  6432 -6433 -42 -6436 0

c  0+1 --> 1
c    (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧  p_42) -> (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0)
c  in CNF:
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_2
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_1
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨  b^{3, 15}_0
c  in DIMACS:
 6431  6432  6433 -42 -6434 0
 6431  6432  6433 -42 -6435 0
 6431  6432  6433 -42  6436 0

c  1+1 --> 2
c    (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0 ∧  p_42) -> (-b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0)
c  in CNF:
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_2
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨  b^{3, 15}_1
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ -p_42 ∨ -b^{3, 15}_0
c  in DIMACS:
 6431  6432 -6433 -42 -6434 0
 6431  6432 -6433 -42  6435 0
 6431  6432 -6433 -42 -6436 0

c  2+1 --> break 
c    (-b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧  p_42) -> break
c  in CNF:
c     b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 6431 -6432  6433 -42 1162 0


c  2-1 --> 1
c    (-b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧ -p_42) -> (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0)
c  in CNF:
c     b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_2
c     b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_1
c     b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨  b^{3, 15}_0
c  in DIMACS:
 6431 -6432  6433  42 -6434 0
 6431 -6432  6433  42 -6435 0
 6431 -6432  6433  42  6436 0

c  1-1 --> 0
c    (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0 ∧ -p_42) -> (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧ -b^{3, 15}_0)
c  in CNF:
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_2
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_1
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_0
c  in DIMACS:
 6431  6432 -6433  42 -6434 0
 6431  6432 -6433  42 -6435 0
 6431  6432 -6433  42 -6436 0

c  0-1 --> -1
c    (-b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧ -p_42) -> ( b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0)
c  in CNF:
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨  b^{3, 15}_2
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_1
c     b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨  b^{3, 15}_0
c  in DIMACS:
 6431  6432  6433  42  6434 0
 6431  6432  6433  42 -6435 0
 6431  6432  6433  42  6436 0

c  -1-1 --> -2
c    ( b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧  b^{3, 14}_0 ∧ -p_42) -> ( b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0)
c  in CNF:
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨  b^{3, 15}_2
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨  b^{3, 15}_1
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨  p_42 ∨ -b^{3, 15}_0
c  in DIMACS:
-6431  6432 -6433  42  6434 0
-6431  6432 -6433  42  6435 0
-6431  6432 -6433  42 -6436 0

c  -2-1 --> break 
c    ( b^{3, 14}_2 ∧  b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨  b^{3, 14}_0 ∨  p_42 ∨ break
c  in DIMACS:
-6431 -6432  6433  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 14}_2 ∧ -b^{3, 14}_1 ∧ -b^{3, 14}_0 ∧ true) 
c  in CNF:
c    -b^{3, 14}_2 ∨  b^{3, 14}_1 ∨  b^{3, 14}_0 ∨ false 
c  in DIMACS:
-6431  6432  6433  0

c  3 does not represent an automaton state.
c    -(-b^{3, 14}_2 ∧  b^{3, 14}_1 ∧  b^{3, 14}_0 ∧ true) 
c  in CNF:
c     b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ false 
c  in DIMACS:
 6431 -6432 -6433  0
c  -3 does not represent an automaton state.
c    -( b^{3, 14}_2 ∧  b^{3, 14}_1 ∧  b^{3, 14}_0 ∧ true) 
c  in CNF:
c    -b^{3, 14}_2 ∨ -b^{3, 14}_1 ∨ -b^{3, 14}_0 ∨ false 
c  in DIMACS:
-6431 -6432 -6433  0

c i = 15
c  -2+1 --> -1
c    ( b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧  p_45) -> ( b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0)
c  in CNF:
c    -b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨  b^{3, 16}_2
c    -b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_1
c    -b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨  b^{3, 16}_0
c  in DIMACS:
-6434 -6435  6436 -45  6437 0
-6434 -6435  6436 -45 -6438 0
-6434 -6435  6436 -45  6439 0

c  -1+1 --> 0
c    ( b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0 ∧  p_45) -> (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧ -b^{3, 16}_0)
c  in CNF:
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_2
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_1
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_0
c  in DIMACS:
-6434  6435 -6436 -45 -6437 0
-6434  6435 -6436 -45 -6438 0
-6434  6435 -6436 -45 -6439 0

c  0+1 --> 1
c    (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧  p_45) -> (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0)
c  in CNF:
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_2
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_1
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨  b^{3, 16}_0
c  in DIMACS:
 6434  6435  6436 -45 -6437 0
 6434  6435  6436 -45 -6438 0
 6434  6435  6436 -45  6439 0

c  1+1 --> 2
c    (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0 ∧  p_45) -> (-b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0)
c  in CNF:
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_2
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨  b^{3, 16}_1
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ -p_45 ∨ -b^{3, 16}_0
c  in DIMACS:
 6434  6435 -6436 -45 -6437 0
 6434  6435 -6436 -45  6438 0
 6434  6435 -6436 -45 -6439 0

c  2+1 --> break 
c    (-b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧  p_45) -> break
c  in CNF:
c     b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 6434 -6435  6436 -45 1162 0


c  2-1 --> 1
c    (-b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧ -p_45) -> (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0)
c  in CNF:
c     b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_2
c     b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_1
c     b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨  b^{3, 16}_0
c  in DIMACS:
 6434 -6435  6436  45 -6437 0
 6434 -6435  6436  45 -6438 0
 6434 -6435  6436  45  6439 0

c  1-1 --> 0
c    (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0 ∧ -p_45) -> (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧ -b^{3, 16}_0)
c  in CNF:
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_2
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_1
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_0
c  in DIMACS:
 6434  6435 -6436  45 -6437 0
 6434  6435 -6436  45 -6438 0
 6434  6435 -6436  45 -6439 0

c  0-1 --> -1
c    (-b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧ -p_45) -> ( b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0)
c  in CNF:
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨  b^{3, 16}_2
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_1
c     b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨  b^{3, 16}_0
c  in DIMACS:
 6434  6435  6436  45  6437 0
 6434  6435  6436  45 -6438 0
 6434  6435  6436  45  6439 0

c  -1-1 --> -2
c    ( b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧  b^{3, 15}_0 ∧ -p_45) -> ( b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0)
c  in CNF:
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨  b^{3, 16}_2
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨  b^{3, 16}_1
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨  p_45 ∨ -b^{3, 16}_0
c  in DIMACS:
-6434  6435 -6436  45  6437 0
-6434  6435 -6436  45  6438 0
-6434  6435 -6436  45 -6439 0

c  -2-1 --> break 
c    ( b^{3, 15}_2 ∧  b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨  b^{3, 15}_0 ∨  p_45 ∨ break
c  in DIMACS:
-6434 -6435  6436  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 15}_2 ∧ -b^{3, 15}_1 ∧ -b^{3, 15}_0 ∧ true) 
c  in CNF:
c    -b^{3, 15}_2 ∨  b^{3, 15}_1 ∨  b^{3, 15}_0 ∨ false 
c  in DIMACS:
-6434  6435  6436  0

c  3 does not represent an automaton state.
c    -(-b^{3, 15}_2 ∧  b^{3, 15}_1 ∧  b^{3, 15}_0 ∧ true) 
c  in CNF:
c     b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ false 
c  in DIMACS:
 6434 -6435 -6436  0
c  -3 does not represent an automaton state.
c    -( b^{3, 15}_2 ∧  b^{3, 15}_1 ∧  b^{3, 15}_0 ∧ true) 
c  in CNF:
c    -b^{3, 15}_2 ∨ -b^{3, 15}_1 ∨ -b^{3, 15}_0 ∨ false 
c  in DIMACS:
-6434 -6435 -6436  0

c i = 16
c  -2+1 --> -1
c    ( b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧  p_48) -> ( b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0)
c  in CNF:
c    -b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨  b^{3, 17}_2
c    -b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_1
c    -b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨  b^{3, 17}_0
c  in DIMACS:
-6437 -6438  6439 -48  6440 0
-6437 -6438  6439 -48 -6441 0
-6437 -6438  6439 -48  6442 0

c  -1+1 --> 0
c    ( b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0 ∧  p_48) -> (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧ -b^{3, 17}_0)
c  in CNF:
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_2
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_1
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_0
c  in DIMACS:
-6437  6438 -6439 -48 -6440 0
-6437  6438 -6439 -48 -6441 0
-6437  6438 -6439 -48 -6442 0

c  0+1 --> 1
c    (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧  p_48) -> (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0)
c  in CNF:
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_2
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_1
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨  b^{3, 17}_0
c  in DIMACS:
 6437  6438  6439 -48 -6440 0
 6437  6438  6439 -48 -6441 0
 6437  6438  6439 -48  6442 0

c  1+1 --> 2
c    (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0 ∧  p_48) -> (-b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0)
c  in CNF:
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_2
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨  b^{3, 17}_1
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ -p_48 ∨ -b^{3, 17}_0
c  in DIMACS:
 6437  6438 -6439 -48 -6440 0
 6437  6438 -6439 -48  6441 0
 6437  6438 -6439 -48 -6442 0

c  2+1 --> break 
c    (-b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧  p_48) -> break
c  in CNF:
c     b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 6437 -6438  6439 -48 1162 0


c  2-1 --> 1
c    (-b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧ -p_48) -> (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0)
c  in CNF:
c     b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_2
c     b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_1
c     b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨  b^{3, 17}_0
c  in DIMACS:
 6437 -6438  6439  48 -6440 0
 6437 -6438  6439  48 -6441 0
 6437 -6438  6439  48  6442 0

c  1-1 --> 0
c    (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0 ∧ -p_48) -> (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧ -b^{3, 17}_0)
c  in CNF:
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_2
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_1
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_0
c  in DIMACS:
 6437  6438 -6439  48 -6440 0
 6437  6438 -6439  48 -6441 0
 6437  6438 -6439  48 -6442 0

c  0-1 --> -1
c    (-b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧ -p_48) -> ( b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0)
c  in CNF:
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨  b^{3, 17}_2
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_1
c     b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨  b^{3, 17}_0
c  in DIMACS:
 6437  6438  6439  48  6440 0
 6437  6438  6439  48 -6441 0
 6437  6438  6439  48  6442 0

c  -1-1 --> -2
c    ( b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧  b^{3, 16}_0 ∧ -p_48) -> ( b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0)
c  in CNF:
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨  b^{3, 17}_2
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨  b^{3, 17}_1
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨  p_48 ∨ -b^{3, 17}_0
c  in DIMACS:
-6437  6438 -6439  48  6440 0
-6437  6438 -6439  48  6441 0
-6437  6438 -6439  48 -6442 0

c  -2-1 --> break 
c    ( b^{3, 16}_2 ∧  b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨  b^{3, 16}_0 ∨  p_48 ∨ break
c  in DIMACS:
-6437 -6438  6439  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 16}_2 ∧ -b^{3, 16}_1 ∧ -b^{3, 16}_0 ∧ true) 
c  in CNF:
c    -b^{3, 16}_2 ∨  b^{3, 16}_1 ∨  b^{3, 16}_0 ∨ false 
c  in DIMACS:
-6437  6438  6439  0

c  3 does not represent an automaton state.
c    -(-b^{3, 16}_2 ∧  b^{3, 16}_1 ∧  b^{3, 16}_0 ∧ true) 
c  in CNF:
c     b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ false 
c  in DIMACS:
 6437 -6438 -6439  0
c  -3 does not represent an automaton state.
c    -( b^{3, 16}_2 ∧  b^{3, 16}_1 ∧  b^{3, 16}_0 ∧ true) 
c  in CNF:
c    -b^{3, 16}_2 ∨ -b^{3, 16}_1 ∨ -b^{3, 16}_0 ∨ false 
c  in DIMACS:
-6437 -6438 -6439  0

c i = 17
c  -2+1 --> -1
c    ( b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧  p_51) -> ( b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0)
c  in CNF:
c    -b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨  b^{3, 18}_2
c    -b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_1
c    -b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨  b^{3, 18}_0
c  in DIMACS:
-6440 -6441  6442 -51  6443 0
-6440 -6441  6442 -51 -6444 0
-6440 -6441  6442 -51  6445 0

c  -1+1 --> 0
c    ( b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0 ∧  p_51) -> (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧ -b^{3, 18}_0)
c  in CNF:
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_2
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_1
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_0
c  in DIMACS:
-6440  6441 -6442 -51 -6443 0
-6440  6441 -6442 -51 -6444 0
-6440  6441 -6442 -51 -6445 0

c  0+1 --> 1
c    (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧  p_51) -> (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0)
c  in CNF:
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_2
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_1
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨  b^{3, 18}_0
c  in DIMACS:
 6440  6441  6442 -51 -6443 0
 6440  6441  6442 -51 -6444 0
 6440  6441  6442 -51  6445 0

c  1+1 --> 2
c    (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0 ∧  p_51) -> (-b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0)
c  in CNF:
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_2
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨  b^{3, 18}_1
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ -p_51 ∨ -b^{3, 18}_0
c  in DIMACS:
 6440  6441 -6442 -51 -6443 0
 6440  6441 -6442 -51  6444 0
 6440  6441 -6442 -51 -6445 0

c  2+1 --> break 
c    (-b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧  p_51) -> break
c  in CNF:
c     b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ -p_51 ∨ break
c  in DIMACS:
 6440 -6441  6442 -51 1162 0


c  2-1 --> 1
c    (-b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧ -p_51) -> (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0)
c  in CNF:
c     b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_2
c     b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_1
c     b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨  b^{3, 18}_0
c  in DIMACS:
 6440 -6441  6442  51 -6443 0
 6440 -6441  6442  51 -6444 0
 6440 -6441  6442  51  6445 0

c  1-1 --> 0
c    (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0 ∧ -p_51) -> (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧ -b^{3, 18}_0)
c  in CNF:
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_2
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_1
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_0
c  in DIMACS:
 6440  6441 -6442  51 -6443 0
 6440  6441 -6442  51 -6444 0
 6440  6441 -6442  51 -6445 0

c  0-1 --> -1
c    (-b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧ -p_51) -> ( b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0)
c  in CNF:
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨  b^{3, 18}_2
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_1
c     b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨  b^{3, 18}_0
c  in DIMACS:
 6440  6441  6442  51  6443 0
 6440  6441  6442  51 -6444 0
 6440  6441  6442  51  6445 0

c  -1-1 --> -2
c    ( b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧  b^{3, 17}_0 ∧ -p_51) -> ( b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0)
c  in CNF:
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨  b^{3, 18}_2
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨  b^{3, 18}_1
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨  p_51 ∨ -b^{3, 18}_0
c  in DIMACS:
-6440  6441 -6442  51  6443 0
-6440  6441 -6442  51  6444 0
-6440  6441 -6442  51 -6445 0

c  -2-1 --> break 
c    ( b^{3, 17}_2 ∧  b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧ -p_51) -> break
c  in CNF:
c    -b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨  b^{3, 17}_0 ∨  p_51 ∨ break
c  in DIMACS:
-6440 -6441  6442  51 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 17}_2 ∧ -b^{3, 17}_1 ∧ -b^{3, 17}_0 ∧ true) 
c  in CNF:
c    -b^{3, 17}_2 ∨  b^{3, 17}_1 ∨  b^{3, 17}_0 ∨ false 
c  in DIMACS:
-6440  6441  6442  0

c  3 does not represent an automaton state.
c    -(-b^{3, 17}_2 ∧  b^{3, 17}_1 ∧  b^{3, 17}_0 ∧ true) 
c  in CNF:
c     b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ false 
c  in DIMACS:
 6440 -6441 -6442  0
c  -3 does not represent an automaton state.
c    -( b^{3, 17}_2 ∧  b^{3, 17}_1 ∧  b^{3, 17}_0 ∧ true) 
c  in CNF:
c    -b^{3, 17}_2 ∨ -b^{3, 17}_1 ∨ -b^{3, 17}_0 ∨ false 
c  in DIMACS:
-6440 -6441 -6442  0

c i = 18
c  -2+1 --> -1
c    ( b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧  p_54) -> ( b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0)
c  in CNF:
c    -b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨  b^{3, 19}_2
c    -b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_1
c    -b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨  b^{3, 19}_0
c  in DIMACS:
-6443 -6444  6445 -54  6446 0
-6443 -6444  6445 -54 -6447 0
-6443 -6444  6445 -54  6448 0

c  -1+1 --> 0
c    ( b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0 ∧  p_54) -> (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧ -b^{3, 19}_0)
c  in CNF:
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_2
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_1
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_0
c  in DIMACS:
-6443  6444 -6445 -54 -6446 0
-6443  6444 -6445 -54 -6447 0
-6443  6444 -6445 -54 -6448 0

c  0+1 --> 1
c    (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧  p_54) -> (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0)
c  in CNF:
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_2
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_1
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨  b^{3, 19}_0
c  in DIMACS:
 6443  6444  6445 -54 -6446 0
 6443  6444  6445 -54 -6447 0
 6443  6444  6445 -54  6448 0

c  1+1 --> 2
c    (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0 ∧  p_54) -> (-b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0)
c  in CNF:
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_2
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨  b^{3, 19}_1
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ -p_54 ∨ -b^{3, 19}_0
c  in DIMACS:
 6443  6444 -6445 -54 -6446 0
 6443  6444 -6445 -54  6447 0
 6443  6444 -6445 -54 -6448 0

c  2+1 --> break 
c    (-b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧  p_54) -> break
c  in CNF:
c     b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 6443 -6444  6445 -54 1162 0


c  2-1 --> 1
c    (-b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧ -p_54) -> (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0)
c  in CNF:
c     b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_2
c     b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_1
c     b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨  b^{3, 19}_0
c  in DIMACS:
 6443 -6444  6445  54 -6446 0
 6443 -6444  6445  54 -6447 0
 6443 -6444  6445  54  6448 0

c  1-1 --> 0
c    (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0 ∧ -p_54) -> (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧ -b^{3, 19}_0)
c  in CNF:
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_2
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_1
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_0
c  in DIMACS:
 6443  6444 -6445  54 -6446 0
 6443  6444 -6445  54 -6447 0
 6443  6444 -6445  54 -6448 0

c  0-1 --> -1
c    (-b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧ -p_54) -> ( b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0)
c  in CNF:
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨  b^{3, 19}_2
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_1
c     b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨  b^{3, 19}_0
c  in DIMACS:
 6443  6444  6445  54  6446 0
 6443  6444  6445  54 -6447 0
 6443  6444  6445  54  6448 0

c  -1-1 --> -2
c    ( b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧  b^{3, 18}_0 ∧ -p_54) -> ( b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0)
c  in CNF:
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨  b^{3, 19}_2
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨  b^{3, 19}_1
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨  p_54 ∨ -b^{3, 19}_0
c  in DIMACS:
-6443  6444 -6445  54  6446 0
-6443  6444 -6445  54  6447 0
-6443  6444 -6445  54 -6448 0

c  -2-1 --> break 
c    ( b^{3, 18}_2 ∧  b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨  b^{3, 18}_0 ∨  p_54 ∨ break
c  in DIMACS:
-6443 -6444  6445  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 18}_2 ∧ -b^{3, 18}_1 ∧ -b^{3, 18}_0 ∧ true) 
c  in CNF:
c    -b^{3, 18}_2 ∨  b^{3, 18}_1 ∨  b^{3, 18}_0 ∨ false 
c  in DIMACS:
-6443  6444  6445  0

c  3 does not represent an automaton state.
c    -(-b^{3, 18}_2 ∧  b^{3, 18}_1 ∧  b^{3, 18}_0 ∧ true) 
c  in CNF:
c     b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ false 
c  in DIMACS:
 6443 -6444 -6445  0
c  -3 does not represent an automaton state.
c    -( b^{3, 18}_2 ∧  b^{3, 18}_1 ∧  b^{3, 18}_0 ∧ true) 
c  in CNF:
c    -b^{3, 18}_2 ∨ -b^{3, 18}_1 ∨ -b^{3, 18}_0 ∨ false 
c  in DIMACS:
-6443 -6444 -6445  0

c i = 19
c  -2+1 --> -1
c    ( b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧  p_57) -> ( b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0)
c  in CNF:
c    -b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨  b^{3, 20}_2
c    -b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_1
c    -b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨  b^{3, 20}_0
c  in DIMACS:
-6446 -6447  6448 -57  6449 0
-6446 -6447  6448 -57 -6450 0
-6446 -6447  6448 -57  6451 0

c  -1+1 --> 0
c    ( b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0 ∧  p_57) -> (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧ -b^{3, 20}_0)
c  in CNF:
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_2
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_1
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_0
c  in DIMACS:
-6446  6447 -6448 -57 -6449 0
-6446  6447 -6448 -57 -6450 0
-6446  6447 -6448 -57 -6451 0

c  0+1 --> 1
c    (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧  p_57) -> (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0)
c  in CNF:
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_2
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_1
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨  b^{3, 20}_0
c  in DIMACS:
 6446  6447  6448 -57 -6449 0
 6446  6447  6448 -57 -6450 0
 6446  6447  6448 -57  6451 0

c  1+1 --> 2
c    (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0 ∧  p_57) -> (-b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0)
c  in CNF:
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_2
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨  b^{3, 20}_1
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ -p_57 ∨ -b^{3, 20}_0
c  in DIMACS:
 6446  6447 -6448 -57 -6449 0
 6446  6447 -6448 -57  6450 0
 6446  6447 -6448 -57 -6451 0

c  2+1 --> break 
c    (-b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧  p_57) -> break
c  in CNF:
c     b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ -p_57 ∨ break
c  in DIMACS:
 6446 -6447  6448 -57 1162 0


c  2-1 --> 1
c    (-b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧ -p_57) -> (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0)
c  in CNF:
c     b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_2
c     b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_1
c     b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨  b^{3, 20}_0
c  in DIMACS:
 6446 -6447  6448  57 -6449 0
 6446 -6447  6448  57 -6450 0
 6446 -6447  6448  57  6451 0

c  1-1 --> 0
c    (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0 ∧ -p_57) -> (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧ -b^{3, 20}_0)
c  in CNF:
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_2
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_1
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_0
c  in DIMACS:
 6446  6447 -6448  57 -6449 0
 6446  6447 -6448  57 -6450 0
 6446  6447 -6448  57 -6451 0

c  0-1 --> -1
c    (-b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧ -p_57) -> ( b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0)
c  in CNF:
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨  b^{3, 20}_2
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_1
c     b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨  b^{3, 20}_0
c  in DIMACS:
 6446  6447  6448  57  6449 0
 6446  6447  6448  57 -6450 0
 6446  6447  6448  57  6451 0

c  -1-1 --> -2
c    ( b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧  b^{3, 19}_0 ∧ -p_57) -> ( b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0)
c  in CNF:
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨  b^{3, 20}_2
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨  b^{3, 20}_1
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨  p_57 ∨ -b^{3, 20}_0
c  in DIMACS:
-6446  6447 -6448  57  6449 0
-6446  6447 -6448  57  6450 0
-6446  6447 -6448  57 -6451 0

c  -2-1 --> break 
c    ( b^{3, 19}_2 ∧  b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧ -p_57) -> break
c  in CNF:
c    -b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨  b^{3, 19}_0 ∨  p_57 ∨ break
c  in DIMACS:
-6446 -6447  6448  57 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 19}_2 ∧ -b^{3, 19}_1 ∧ -b^{3, 19}_0 ∧ true) 
c  in CNF:
c    -b^{3, 19}_2 ∨  b^{3, 19}_1 ∨  b^{3, 19}_0 ∨ false 
c  in DIMACS:
-6446  6447  6448  0

c  3 does not represent an automaton state.
c    -(-b^{3, 19}_2 ∧  b^{3, 19}_1 ∧  b^{3, 19}_0 ∧ true) 
c  in CNF:
c     b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ false 
c  in DIMACS:
 6446 -6447 -6448  0
c  -3 does not represent an automaton state.
c    -( b^{3, 19}_2 ∧  b^{3, 19}_1 ∧  b^{3, 19}_0 ∧ true) 
c  in CNF:
c    -b^{3, 19}_2 ∨ -b^{3, 19}_1 ∨ -b^{3, 19}_0 ∨ false 
c  in DIMACS:
-6446 -6447 -6448  0

c i = 20
c  -2+1 --> -1
c    ( b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧  p_60) -> ( b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0)
c  in CNF:
c    -b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨  b^{3, 21}_2
c    -b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_1
c    -b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨  b^{3, 21}_0
c  in DIMACS:
-6449 -6450  6451 -60  6452 0
-6449 -6450  6451 -60 -6453 0
-6449 -6450  6451 -60  6454 0

c  -1+1 --> 0
c    ( b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0 ∧  p_60) -> (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧ -b^{3, 21}_0)
c  in CNF:
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_2
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_1
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_0
c  in DIMACS:
-6449  6450 -6451 -60 -6452 0
-6449  6450 -6451 -60 -6453 0
-6449  6450 -6451 -60 -6454 0

c  0+1 --> 1
c    (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧  p_60) -> (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0)
c  in CNF:
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_2
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_1
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨  b^{3, 21}_0
c  in DIMACS:
 6449  6450  6451 -60 -6452 0
 6449  6450  6451 -60 -6453 0
 6449  6450  6451 -60  6454 0

c  1+1 --> 2
c    (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0 ∧  p_60) -> (-b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0)
c  in CNF:
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_2
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨  b^{3, 21}_1
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ -p_60 ∨ -b^{3, 21}_0
c  in DIMACS:
 6449  6450 -6451 -60 -6452 0
 6449  6450 -6451 -60  6453 0
 6449  6450 -6451 -60 -6454 0

c  2+1 --> break 
c    (-b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧  p_60) -> break
c  in CNF:
c     b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 6449 -6450  6451 -60 1162 0


c  2-1 --> 1
c    (-b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧ -p_60) -> (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0)
c  in CNF:
c     b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_2
c     b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_1
c     b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨  b^{3, 21}_0
c  in DIMACS:
 6449 -6450  6451  60 -6452 0
 6449 -6450  6451  60 -6453 0
 6449 -6450  6451  60  6454 0

c  1-1 --> 0
c    (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0 ∧ -p_60) -> (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧ -b^{3, 21}_0)
c  in CNF:
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_2
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_1
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_0
c  in DIMACS:
 6449  6450 -6451  60 -6452 0
 6449  6450 -6451  60 -6453 0
 6449  6450 -6451  60 -6454 0

c  0-1 --> -1
c    (-b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧ -p_60) -> ( b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0)
c  in CNF:
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨  b^{3, 21}_2
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_1
c     b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨  b^{3, 21}_0
c  in DIMACS:
 6449  6450  6451  60  6452 0
 6449  6450  6451  60 -6453 0
 6449  6450  6451  60  6454 0

c  -1-1 --> -2
c    ( b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧  b^{3, 20}_0 ∧ -p_60) -> ( b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0)
c  in CNF:
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨  b^{3, 21}_2
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨  b^{3, 21}_1
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨  p_60 ∨ -b^{3, 21}_0
c  in DIMACS:
-6449  6450 -6451  60  6452 0
-6449  6450 -6451  60  6453 0
-6449  6450 -6451  60 -6454 0

c  -2-1 --> break 
c    ( b^{3, 20}_2 ∧  b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨  b^{3, 20}_0 ∨  p_60 ∨ break
c  in DIMACS:
-6449 -6450  6451  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 20}_2 ∧ -b^{3, 20}_1 ∧ -b^{3, 20}_0 ∧ true) 
c  in CNF:
c    -b^{3, 20}_2 ∨  b^{3, 20}_1 ∨  b^{3, 20}_0 ∨ false 
c  in DIMACS:
-6449  6450  6451  0

c  3 does not represent an automaton state.
c    -(-b^{3, 20}_2 ∧  b^{3, 20}_1 ∧  b^{3, 20}_0 ∧ true) 
c  in CNF:
c     b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ false 
c  in DIMACS:
 6449 -6450 -6451  0
c  -3 does not represent an automaton state.
c    -( b^{3, 20}_2 ∧  b^{3, 20}_1 ∧  b^{3, 20}_0 ∧ true) 
c  in CNF:
c    -b^{3, 20}_2 ∨ -b^{3, 20}_1 ∨ -b^{3, 20}_0 ∨ false 
c  in DIMACS:
-6449 -6450 -6451  0

c i = 21
c  -2+1 --> -1
c    ( b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧  p_63) -> ( b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0)
c  in CNF:
c    -b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨  b^{3, 22}_2
c    -b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_1
c    -b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨  b^{3, 22}_0
c  in DIMACS:
-6452 -6453  6454 -63  6455 0
-6452 -6453  6454 -63 -6456 0
-6452 -6453  6454 -63  6457 0

c  -1+1 --> 0
c    ( b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0 ∧  p_63) -> (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧ -b^{3, 22}_0)
c  in CNF:
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_2
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_1
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_0
c  in DIMACS:
-6452  6453 -6454 -63 -6455 0
-6452  6453 -6454 -63 -6456 0
-6452  6453 -6454 -63 -6457 0

c  0+1 --> 1
c    (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧  p_63) -> (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0)
c  in CNF:
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_2
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_1
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨  b^{3, 22}_0
c  in DIMACS:
 6452  6453  6454 -63 -6455 0
 6452  6453  6454 -63 -6456 0
 6452  6453  6454 -63  6457 0

c  1+1 --> 2
c    (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0 ∧  p_63) -> (-b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0)
c  in CNF:
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_2
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨  b^{3, 22}_1
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ -p_63 ∨ -b^{3, 22}_0
c  in DIMACS:
 6452  6453 -6454 -63 -6455 0
 6452  6453 -6454 -63  6456 0
 6452  6453 -6454 -63 -6457 0

c  2+1 --> break 
c    (-b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧  p_63) -> break
c  in CNF:
c     b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 6452 -6453  6454 -63 1162 0


c  2-1 --> 1
c    (-b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧ -p_63) -> (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0)
c  in CNF:
c     b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_2
c     b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_1
c     b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨  b^{3, 22}_0
c  in DIMACS:
 6452 -6453  6454  63 -6455 0
 6452 -6453  6454  63 -6456 0
 6452 -6453  6454  63  6457 0

c  1-1 --> 0
c    (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0 ∧ -p_63) -> (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧ -b^{3, 22}_0)
c  in CNF:
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_2
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_1
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_0
c  in DIMACS:
 6452  6453 -6454  63 -6455 0
 6452  6453 -6454  63 -6456 0
 6452  6453 -6454  63 -6457 0

c  0-1 --> -1
c    (-b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧ -p_63) -> ( b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0)
c  in CNF:
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨  b^{3, 22}_2
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_1
c     b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨  b^{3, 22}_0
c  in DIMACS:
 6452  6453  6454  63  6455 0
 6452  6453  6454  63 -6456 0
 6452  6453  6454  63  6457 0

c  -1-1 --> -2
c    ( b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧  b^{3, 21}_0 ∧ -p_63) -> ( b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0)
c  in CNF:
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨  b^{3, 22}_2
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨  b^{3, 22}_1
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨  p_63 ∨ -b^{3, 22}_0
c  in DIMACS:
-6452  6453 -6454  63  6455 0
-6452  6453 -6454  63  6456 0
-6452  6453 -6454  63 -6457 0

c  -2-1 --> break 
c    ( b^{3, 21}_2 ∧  b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨  b^{3, 21}_0 ∨  p_63 ∨ break
c  in DIMACS:
-6452 -6453  6454  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 21}_2 ∧ -b^{3, 21}_1 ∧ -b^{3, 21}_0 ∧ true) 
c  in CNF:
c    -b^{3, 21}_2 ∨  b^{3, 21}_1 ∨  b^{3, 21}_0 ∨ false 
c  in DIMACS:
-6452  6453  6454  0

c  3 does not represent an automaton state.
c    -(-b^{3, 21}_2 ∧  b^{3, 21}_1 ∧  b^{3, 21}_0 ∧ true) 
c  in CNF:
c     b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ false 
c  in DIMACS:
 6452 -6453 -6454  0
c  -3 does not represent an automaton state.
c    -( b^{3, 21}_2 ∧  b^{3, 21}_1 ∧  b^{3, 21}_0 ∧ true) 
c  in CNF:
c    -b^{3, 21}_2 ∨ -b^{3, 21}_1 ∨ -b^{3, 21}_0 ∨ false 
c  in DIMACS:
-6452 -6453 -6454  0

c i = 22
c  -2+1 --> -1
c    ( b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧  p_66) -> ( b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0)
c  in CNF:
c    -b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨  b^{3, 23}_2
c    -b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_1
c    -b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨  b^{3, 23}_0
c  in DIMACS:
-6455 -6456  6457 -66  6458 0
-6455 -6456  6457 -66 -6459 0
-6455 -6456  6457 -66  6460 0

c  -1+1 --> 0
c    ( b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0 ∧  p_66) -> (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧ -b^{3, 23}_0)
c  in CNF:
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_2
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_1
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_0
c  in DIMACS:
-6455  6456 -6457 -66 -6458 0
-6455  6456 -6457 -66 -6459 0
-6455  6456 -6457 -66 -6460 0

c  0+1 --> 1
c    (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧  p_66) -> (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0)
c  in CNF:
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_2
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_1
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨  b^{3, 23}_0
c  in DIMACS:
 6455  6456  6457 -66 -6458 0
 6455  6456  6457 -66 -6459 0
 6455  6456  6457 -66  6460 0

c  1+1 --> 2
c    (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0 ∧  p_66) -> (-b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0)
c  in CNF:
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_2
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨  b^{3, 23}_1
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ -p_66 ∨ -b^{3, 23}_0
c  in DIMACS:
 6455  6456 -6457 -66 -6458 0
 6455  6456 -6457 -66  6459 0
 6455  6456 -6457 -66 -6460 0

c  2+1 --> break 
c    (-b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧  p_66) -> break
c  in CNF:
c     b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 6455 -6456  6457 -66 1162 0


c  2-1 --> 1
c    (-b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧ -p_66) -> (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0)
c  in CNF:
c     b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_2
c     b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_1
c     b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨  b^{3, 23}_0
c  in DIMACS:
 6455 -6456  6457  66 -6458 0
 6455 -6456  6457  66 -6459 0
 6455 -6456  6457  66  6460 0

c  1-1 --> 0
c    (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0 ∧ -p_66) -> (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧ -b^{3, 23}_0)
c  in CNF:
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_2
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_1
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_0
c  in DIMACS:
 6455  6456 -6457  66 -6458 0
 6455  6456 -6457  66 -6459 0
 6455  6456 -6457  66 -6460 0

c  0-1 --> -1
c    (-b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧ -p_66) -> ( b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0)
c  in CNF:
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨  b^{3, 23}_2
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_1
c     b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨  b^{3, 23}_0
c  in DIMACS:
 6455  6456  6457  66  6458 0
 6455  6456  6457  66 -6459 0
 6455  6456  6457  66  6460 0

c  -1-1 --> -2
c    ( b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧  b^{3, 22}_0 ∧ -p_66) -> ( b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0)
c  in CNF:
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨  b^{3, 23}_2
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨  b^{3, 23}_1
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨  p_66 ∨ -b^{3, 23}_0
c  in DIMACS:
-6455  6456 -6457  66  6458 0
-6455  6456 -6457  66  6459 0
-6455  6456 -6457  66 -6460 0

c  -2-1 --> break 
c    ( b^{3, 22}_2 ∧  b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨  b^{3, 22}_0 ∨  p_66 ∨ break
c  in DIMACS:
-6455 -6456  6457  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 22}_2 ∧ -b^{3, 22}_1 ∧ -b^{3, 22}_0 ∧ true) 
c  in CNF:
c    -b^{3, 22}_2 ∨  b^{3, 22}_1 ∨  b^{3, 22}_0 ∨ false 
c  in DIMACS:
-6455  6456  6457  0

c  3 does not represent an automaton state.
c    -(-b^{3, 22}_2 ∧  b^{3, 22}_1 ∧  b^{3, 22}_0 ∧ true) 
c  in CNF:
c     b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ false 
c  in DIMACS:
 6455 -6456 -6457  0
c  -3 does not represent an automaton state.
c    -( b^{3, 22}_2 ∧  b^{3, 22}_1 ∧  b^{3, 22}_0 ∧ true) 
c  in CNF:
c    -b^{3, 22}_2 ∨ -b^{3, 22}_1 ∨ -b^{3, 22}_0 ∨ false 
c  in DIMACS:
-6455 -6456 -6457  0

c i = 23
c  -2+1 --> -1
c    ( b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧  p_69) -> ( b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0)
c  in CNF:
c    -b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨  b^{3, 24}_2
c    -b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_1
c    -b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨  b^{3, 24}_0
c  in DIMACS:
-6458 -6459  6460 -69  6461 0
-6458 -6459  6460 -69 -6462 0
-6458 -6459  6460 -69  6463 0

c  -1+1 --> 0
c    ( b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0 ∧  p_69) -> (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧ -b^{3, 24}_0)
c  in CNF:
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_2
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_1
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_0
c  in DIMACS:
-6458  6459 -6460 -69 -6461 0
-6458  6459 -6460 -69 -6462 0
-6458  6459 -6460 -69 -6463 0

c  0+1 --> 1
c    (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧  p_69) -> (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0)
c  in CNF:
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_2
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_1
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨  b^{3, 24}_0
c  in DIMACS:
 6458  6459  6460 -69 -6461 0
 6458  6459  6460 -69 -6462 0
 6458  6459  6460 -69  6463 0

c  1+1 --> 2
c    (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0 ∧  p_69) -> (-b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0)
c  in CNF:
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_2
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨  b^{3, 24}_1
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ -p_69 ∨ -b^{3, 24}_0
c  in DIMACS:
 6458  6459 -6460 -69 -6461 0
 6458  6459 -6460 -69  6462 0
 6458  6459 -6460 -69 -6463 0

c  2+1 --> break 
c    (-b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧  p_69) -> break
c  in CNF:
c     b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ -p_69 ∨ break
c  in DIMACS:
 6458 -6459  6460 -69 1162 0


c  2-1 --> 1
c    (-b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧ -p_69) -> (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0)
c  in CNF:
c     b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_2
c     b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_1
c     b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨  b^{3, 24}_0
c  in DIMACS:
 6458 -6459  6460  69 -6461 0
 6458 -6459  6460  69 -6462 0
 6458 -6459  6460  69  6463 0

c  1-1 --> 0
c    (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0 ∧ -p_69) -> (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧ -b^{3, 24}_0)
c  in CNF:
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_2
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_1
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_0
c  in DIMACS:
 6458  6459 -6460  69 -6461 0
 6458  6459 -6460  69 -6462 0
 6458  6459 -6460  69 -6463 0

c  0-1 --> -1
c    (-b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧ -p_69) -> ( b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0)
c  in CNF:
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨  b^{3, 24}_2
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_1
c     b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨  b^{3, 24}_0
c  in DIMACS:
 6458  6459  6460  69  6461 0
 6458  6459  6460  69 -6462 0
 6458  6459  6460  69  6463 0

c  -1-1 --> -2
c    ( b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧  b^{3, 23}_0 ∧ -p_69) -> ( b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0)
c  in CNF:
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨  b^{3, 24}_2
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨  b^{3, 24}_1
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨  p_69 ∨ -b^{3, 24}_0
c  in DIMACS:
-6458  6459 -6460  69  6461 0
-6458  6459 -6460  69  6462 0
-6458  6459 -6460  69 -6463 0

c  -2-1 --> break 
c    ( b^{3, 23}_2 ∧  b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧ -p_69) -> break
c  in CNF:
c    -b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨  b^{3, 23}_0 ∨  p_69 ∨ break
c  in DIMACS:
-6458 -6459  6460  69 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 23}_2 ∧ -b^{3, 23}_1 ∧ -b^{3, 23}_0 ∧ true) 
c  in CNF:
c    -b^{3, 23}_2 ∨  b^{3, 23}_1 ∨  b^{3, 23}_0 ∨ false 
c  in DIMACS:
-6458  6459  6460  0

c  3 does not represent an automaton state.
c    -(-b^{3, 23}_2 ∧  b^{3, 23}_1 ∧  b^{3, 23}_0 ∧ true) 
c  in CNF:
c     b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ false 
c  in DIMACS:
 6458 -6459 -6460  0
c  -3 does not represent an automaton state.
c    -( b^{3, 23}_2 ∧  b^{3, 23}_1 ∧  b^{3, 23}_0 ∧ true) 
c  in CNF:
c    -b^{3, 23}_2 ∨ -b^{3, 23}_1 ∨ -b^{3, 23}_0 ∨ false 
c  in DIMACS:
-6458 -6459 -6460  0

c i = 24
c  -2+1 --> -1
c    ( b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧  p_72) -> ( b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0)
c  in CNF:
c    -b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨  b^{3, 25}_2
c    -b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_1
c    -b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨  b^{3, 25}_0
c  in DIMACS:
-6461 -6462  6463 -72  6464 0
-6461 -6462  6463 -72 -6465 0
-6461 -6462  6463 -72  6466 0

c  -1+1 --> 0
c    ( b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0 ∧  p_72) -> (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧ -b^{3, 25}_0)
c  in CNF:
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_2
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_1
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_0
c  in DIMACS:
-6461  6462 -6463 -72 -6464 0
-6461  6462 -6463 -72 -6465 0
-6461  6462 -6463 -72 -6466 0

c  0+1 --> 1
c    (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧  p_72) -> (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0)
c  in CNF:
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_2
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_1
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨  b^{3, 25}_0
c  in DIMACS:
 6461  6462  6463 -72 -6464 0
 6461  6462  6463 -72 -6465 0
 6461  6462  6463 -72  6466 0

c  1+1 --> 2
c    (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0 ∧  p_72) -> (-b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0)
c  in CNF:
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_2
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨  b^{3, 25}_1
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ -p_72 ∨ -b^{3, 25}_0
c  in DIMACS:
 6461  6462 -6463 -72 -6464 0
 6461  6462 -6463 -72  6465 0
 6461  6462 -6463 -72 -6466 0

c  2+1 --> break 
c    (-b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧  p_72) -> break
c  in CNF:
c     b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 6461 -6462  6463 -72 1162 0


c  2-1 --> 1
c    (-b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧ -p_72) -> (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0)
c  in CNF:
c     b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_2
c     b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_1
c     b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨  b^{3, 25}_0
c  in DIMACS:
 6461 -6462  6463  72 -6464 0
 6461 -6462  6463  72 -6465 0
 6461 -6462  6463  72  6466 0

c  1-1 --> 0
c    (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0 ∧ -p_72) -> (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧ -b^{3, 25}_0)
c  in CNF:
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_2
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_1
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_0
c  in DIMACS:
 6461  6462 -6463  72 -6464 0
 6461  6462 -6463  72 -6465 0
 6461  6462 -6463  72 -6466 0

c  0-1 --> -1
c    (-b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧ -p_72) -> ( b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0)
c  in CNF:
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨  b^{3, 25}_2
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_1
c     b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨  b^{3, 25}_0
c  in DIMACS:
 6461  6462  6463  72  6464 0
 6461  6462  6463  72 -6465 0
 6461  6462  6463  72  6466 0

c  -1-1 --> -2
c    ( b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧  b^{3, 24}_0 ∧ -p_72) -> ( b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0)
c  in CNF:
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨  b^{3, 25}_2
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨  b^{3, 25}_1
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨  p_72 ∨ -b^{3, 25}_0
c  in DIMACS:
-6461  6462 -6463  72  6464 0
-6461  6462 -6463  72  6465 0
-6461  6462 -6463  72 -6466 0

c  -2-1 --> break 
c    ( b^{3, 24}_2 ∧  b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨  b^{3, 24}_0 ∨  p_72 ∨ break
c  in DIMACS:
-6461 -6462  6463  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 24}_2 ∧ -b^{3, 24}_1 ∧ -b^{3, 24}_0 ∧ true) 
c  in CNF:
c    -b^{3, 24}_2 ∨  b^{3, 24}_1 ∨  b^{3, 24}_0 ∨ false 
c  in DIMACS:
-6461  6462  6463  0

c  3 does not represent an automaton state.
c    -(-b^{3, 24}_2 ∧  b^{3, 24}_1 ∧  b^{3, 24}_0 ∧ true) 
c  in CNF:
c     b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ false 
c  in DIMACS:
 6461 -6462 -6463  0
c  -3 does not represent an automaton state.
c    -( b^{3, 24}_2 ∧  b^{3, 24}_1 ∧  b^{3, 24}_0 ∧ true) 
c  in CNF:
c    -b^{3, 24}_2 ∨ -b^{3, 24}_1 ∨ -b^{3, 24}_0 ∨ false 
c  in DIMACS:
-6461 -6462 -6463  0

c i = 25
c  -2+1 --> -1
c    ( b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧  p_75) -> ( b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0)
c  in CNF:
c    -b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨  b^{3, 26}_2
c    -b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_1
c    -b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨  b^{3, 26}_0
c  in DIMACS:
-6464 -6465  6466 -75  6467 0
-6464 -6465  6466 -75 -6468 0
-6464 -6465  6466 -75  6469 0

c  -1+1 --> 0
c    ( b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0 ∧  p_75) -> (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧ -b^{3, 26}_0)
c  in CNF:
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_2
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_1
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_0
c  in DIMACS:
-6464  6465 -6466 -75 -6467 0
-6464  6465 -6466 -75 -6468 0
-6464  6465 -6466 -75 -6469 0

c  0+1 --> 1
c    (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧  p_75) -> (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0)
c  in CNF:
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_2
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_1
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨  b^{3, 26}_0
c  in DIMACS:
 6464  6465  6466 -75 -6467 0
 6464  6465  6466 -75 -6468 0
 6464  6465  6466 -75  6469 0

c  1+1 --> 2
c    (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0 ∧  p_75) -> (-b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0)
c  in CNF:
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_2
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨  b^{3, 26}_1
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ -p_75 ∨ -b^{3, 26}_0
c  in DIMACS:
 6464  6465 -6466 -75 -6467 0
 6464  6465 -6466 -75  6468 0
 6464  6465 -6466 -75 -6469 0

c  2+1 --> break 
c    (-b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧  p_75) -> break
c  in CNF:
c     b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 6464 -6465  6466 -75 1162 0


c  2-1 --> 1
c    (-b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧ -p_75) -> (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0)
c  in CNF:
c     b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_2
c     b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_1
c     b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨  b^{3, 26}_0
c  in DIMACS:
 6464 -6465  6466  75 -6467 0
 6464 -6465  6466  75 -6468 0
 6464 -6465  6466  75  6469 0

c  1-1 --> 0
c    (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0 ∧ -p_75) -> (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧ -b^{3, 26}_0)
c  in CNF:
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_2
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_1
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_0
c  in DIMACS:
 6464  6465 -6466  75 -6467 0
 6464  6465 -6466  75 -6468 0
 6464  6465 -6466  75 -6469 0

c  0-1 --> -1
c    (-b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧ -p_75) -> ( b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0)
c  in CNF:
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨  b^{3, 26}_2
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_1
c     b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨  b^{3, 26}_0
c  in DIMACS:
 6464  6465  6466  75  6467 0
 6464  6465  6466  75 -6468 0
 6464  6465  6466  75  6469 0

c  -1-1 --> -2
c    ( b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧  b^{3, 25}_0 ∧ -p_75) -> ( b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0)
c  in CNF:
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨  b^{3, 26}_2
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨  b^{3, 26}_1
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨  p_75 ∨ -b^{3, 26}_0
c  in DIMACS:
-6464  6465 -6466  75  6467 0
-6464  6465 -6466  75  6468 0
-6464  6465 -6466  75 -6469 0

c  -2-1 --> break 
c    ( b^{3, 25}_2 ∧  b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨  b^{3, 25}_0 ∨  p_75 ∨ break
c  in DIMACS:
-6464 -6465  6466  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 25}_2 ∧ -b^{3, 25}_1 ∧ -b^{3, 25}_0 ∧ true) 
c  in CNF:
c    -b^{3, 25}_2 ∨  b^{3, 25}_1 ∨  b^{3, 25}_0 ∨ false 
c  in DIMACS:
-6464  6465  6466  0

c  3 does not represent an automaton state.
c    -(-b^{3, 25}_2 ∧  b^{3, 25}_1 ∧  b^{3, 25}_0 ∧ true) 
c  in CNF:
c     b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ false 
c  in DIMACS:
 6464 -6465 -6466  0
c  -3 does not represent an automaton state.
c    -( b^{3, 25}_2 ∧  b^{3, 25}_1 ∧  b^{3, 25}_0 ∧ true) 
c  in CNF:
c    -b^{3, 25}_2 ∨ -b^{3, 25}_1 ∨ -b^{3, 25}_0 ∨ false 
c  in DIMACS:
-6464 -6465 -6466  0

c i = 26
c  -2+1 --> -1
c    ( b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧  p_78) -> ( b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0)
c  in CNF:
c    -b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨  b^{3, 27}_2
c    -b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_1
c    -b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨  b^{3, 27}_0
c  in DIMACS:
-6467 -6468  6469 -78  6470 0
-6467 -6468  6469 -78 -6471 0
-6467 -6468  6469 -78  6472 0

c  -1+1 --> 0
c    ( b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0 ∧  p_78) -> (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧ -b^{3, 27}_0)
c  in CNF:
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_2
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_1
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_0
c  in DIMACS:
-6467  6468 -6469 -78 -6470 0
-6467  6468 -6469 -78 -6471 0
-6467  6468 -6469 -78 -6472 0

c  0+1 --> 1
c    (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧  p_78) -> (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0)
c  in CNF:
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_2
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_1
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨  b^{3, 27}_0
c  in DIMACS:
 6467  6468  6469 -78 -6470 0
 6467  6468  6469 -78 -6471 0
 6467  6468  6469 -78  6472 0

c  1+1 --> 2
c    (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0 ∧  p_78) -> (-b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0)
c  in CNF:
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_2
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨  b^{3, 27}_1
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ -p_78 ∨ -b^{3, 27}_0
c  in DIMACS:
 6467  6468 -6469 -78 -6470 0
 6467  6468 -6469 -78  6471 0
 6467  6468 -6469 -78 -6472 0

c  2+1 --> break 
c    (-b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧  p_78) -> break
c  in CNF:
c     b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 6467 -6468  6469 -78 1162 0


c  2-1 --> 1
c    (-b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧ -p_78) -> (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0)
c  in CNF:
c     b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_2
c     b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_1
c     b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨  b^{3, 27}_0
c  in DIMACS:
 6467 -6468  6469  78 -6470 0
 6467 -6468  6469  78 -6471 0
 6467 -6468  6469  78  6472 0

c  1-1 --> 0
c    (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0 ∧ -p_78) -> (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧ -b^{3, 27}_0)
c  in CNF:
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_2
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_1
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_0
c  in DIMACS:
 6467  6468 -6469  78 -6470 0
 6467  6468 -6469  78 -6471 0
 6467  6468 -6469  78 -6472 0

c  0-1 --> -1
c    (-b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧ -p_78) -> ( b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0)
c  in CNF:
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨  b^{3, 27}_2
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_1
c     b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨  b^{3, 27}_0
c  in DIMACS:
 6467  6468  6469  78  6470 0
 6467  6468  6469  78 -6471 0
 6467  6468  6469  78  6472 0

c  -1-1 --> -2
c    ( b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧  b^{3, 26}_0 ∧ -p_78) -> ( b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0)
c  in CNF:
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨  b^{3, 27}_2
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨  b^{3, 27}_1
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨  p_78 ∨ -b^{3, 27}_0
c  in DIMACS:
-6467  6468 -6469  78  6470 0
-6467  6468 -6469  78  6471 0
-6467  6468 -6469  78 -6472 0

c  -2-1 --> break 
c    ( b^{3, 26}_2 ∧  b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨  b^{3, 26}_0 ∨  p_78 ∨ break
c  in DIMACS:
-6467 -6468  6469  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 26}_2 ∧ -b^{3, 26}_1 ∧ -b^{3, 26}_0 ∧ true) 
c  in CNF:
c    -b^{3, 26}_2 ∨  b^{3, 26}_1 ∨  b^{3, 26}_0 ∨ false 
c  in DIMACS:
-6467  6468  6469  0

c  3 does not represent an automaton state.
c    -(-b^{3, 26}_2 ∧  b^{3, 26}_1 ∧  b^{3, 26}_0 ∧ true) 
c  in CNF:
c     b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ false 
c  in DIMACS:
 6467 -6468 -6469  0
c  -3 does not represent an automaton state.
c    -( b^{3, 26}_2 ∧  b^{3, 26}_1 ∧  b^{3, 26}_0 ∧ true) 
c  in CNF:
c    -b^{3, 26}_2 ∨ -b^{3, 26}_1 ∨ -b^{3, 26}_0 ∨ false 
c  in DIMACS:
-6467 -6468 -6469  0

c i = 27
c  -2+1 --> -1
c    ( b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧  p_81) -> ( b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0)
c  in CNF:
c    -b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨  b^{3, 28}_2
c    -b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_1
c    -b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨  b^{3, 28}_0
c  in DIMACS:
-6470 -6471  6472 -81  6473 0
-6470 -6471  6472 -81 -6474 0
-6470 -6471  6472 -81  6475 0

c  -1+1 --> 0
c    ( b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0 ∧  p_81) -> (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧ -b^{3, 28}_0)
c  in CNF:
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_2
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_1
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_0
c  in DIMACS:
-6470  6471 -6472 -81 -6473 0
-6470  6471 -6472 -81 -6474 0
-6470  6471 -6472 -81 -6475 0

c  0+1 --> 1
c    (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧  p_81) -> (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0)
c  in CNF:
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_2
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_1
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨  b^{3, 28}_0
c  in DIMACS:
 6470  6471  6472 -81 -6473 0
 6470  6471  6472 -81 -6474 0
 6470  6471  6472 -81  6475 0

c  1+1 --> 2
c    (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0 ∧  p_81) -> (-b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0)
c  in CNF:
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_2
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨  b^{3, 28}_1
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ -p_81 ∨ -b^{3, 28}_0
c  in DIMACS:
 6470  6471 -6472 -81 -6473 0
 6470  6471 -6472 -81  6474 0
 6470  6471 -6472 -81 -6475 0

c  2+1 --> break 
c    (-b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧  p_81) -> break
c  in CNF:
c     b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ -p_81 ∨ break
c  in DIMACS:
 6470 -6471  6472 -81 1162 0


c  2-1 --> 1
c    (-b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧ -p_81) -> (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0)
c  in CNF:
c     b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_2
c     b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_1
c     b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨  b^{3, 28}_0
c  in DIMACS:
 6470 -6471  6472  81 -6473 0
 6470 -6471  6472  81 -6474 0
 6470 -6471  6472  81  6475 0

c  1-1 --> 0
c    (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0 ∧ -p_81) -> (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧ -b^{3, 28}_0)
c  in CNF:
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_2
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_1
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_0
c  in DIMACS:
 6470  6471 -6472  81 -6473 0
 6470  6471 -6472  81 -6474 0
 6470  6471 -6472  81 -6475 0

c  0-1 --> -1
c    (-b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧ -p_81) -> ( b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0)
c  in CNF:
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨  b^{3, 28}_2
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_1
c     b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨  b^{3, 28}_0
c  in DIMACS:
 6470  6471  6472  81  6473 0
 6470  6471  6472  81 -6474 0
 6470  6471  6472  81  6475 0

c  -1-1 --> -2
c    ( b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧  b^{3, 27}_0 ∧ -p_81) -> ( b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0)
c  in CNF:
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨  b^{3, 28}_2
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨  b^{3, 28}_1
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨  p_81 ∨ -b^{3, 28}_0
c  in DIMACS:
-6470  6471 -6472  81  6473 0
-6470  6471 -6472  81  6474 0
-6470  6471 -6472  81 -6475 0

c  -2-1 --> break 
c    ( b^{3, 27}_2 ∧  b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧ -p_81) -> break
c  in CNF:
c    -b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨  b^{3, 27}_0 ∨  p_81 ∨ break
c  in DIMACS:
-6470 -6471  6472  81 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 27}_2 ∧ -b^{3, 27}_1 ∧ -b^{3, 27}_0 ∧ true) 
c  in CNF:
c    -b^{3, 27}_2 ∨  b^{3, 27}_1 ∨  b^{3, 27}_0 ∨ false 
c  in DIMACS:
-6470  6471  6472  0

c  3 does not represent an automaton state.
c    -(-b^{3, 27}_2 ∧  b^{3, 27}_1 ∧  b^{3, 27}_0 ∧ true) 
c  in CNF:
c     b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ false 
c  in DIMACS:
 6470 -6471 -6472  0
c  -3 does not represent an automaton state.
c    -( b^{3, 27}_2 ∧  b^{3, 27}_1 ∧  b^{3, 27}_0 ∧ true) 
c  in CNF:
c    -b^{3, 27}_2 ∨ -b^{3, 27}_1 ∨ -b^{3, 27}_0 ∨ false 
c  in DIMACS:
-6470 -6471 -6472  0

c i = 28
c  -2+1 --> -1
c    ( b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧  p_84) -> ( b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0)
c  in CNF:
c    -b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨  b^{3, 29}_2
c    -b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_1
c    -b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨  b^{3, 29}_0
c  in DIMACS:
-6473 -6474  6475 -84  6476 0
-6473 -6474  6475 -84 -6477 0
-6473 -6474  6475 -84  6478 0

c  -1+1 --> 0
c    ( b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0 ∧  p_84) -> (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧ -b^{3, 29}_0)
c  in CNF:
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_2
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_1
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_0
c  in DIMACS:
-6473  6474 -6475 -84 -6476 0
-6473  6474 -6475 -84 -6477 0
-6473  6474 -6475 -84 -6478 0

c  0+1 --> 1
c    (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧  p_84) -> (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0)
c  in CNF:
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_2
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_1
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨  b^{3, 29}_0
c  in DIMACS:
 6473  6474  6475 -84 -6476 0
 6473  6474  6475 -84 -6477 0
 6473  6474  6475 -84  6478 0

c  1+1 --> 2
c    (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0 ∧  p_84) -> (-b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0)
c  in CNF:
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_2
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨  b^{3, 29}_1
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ -p_84 ∨ -b^{3, 29}_0
c  in DIMACS:
 6473  6474 -6475 -84 -6476 0
 6473  6474 -6475 -84  6477 0
 6473  6474 -6475 -84 -6478 0

c  2+1 --> break 
c    (-b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧  p_84) -> break
c  in CNF:
c     b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 6473 -6474  6475 -84 1162 0


c  2-1 --> 1
c    (-b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧ -p_84) -> (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0)
c  in CNF:
c     b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_2
c     b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_1
c     b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨  b^{3, 29}_0
c  in DIMACS:
 6473 -6474  6475  84 -6476 0
 6473 -6474  6475  84 -6477 0
 6473 -6474  6475  84  6478 0

c  1-1 --> 0
c    (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0 ∧ -p_84) -> (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧ -b^{3, 29}_0)
c  in CNF:
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_2
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_1
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_0
c  in DIMACS:
 6473  6474 -6475  84 -6476 0
 6473  6474 -6475  84 -6477 0
 6473  6474 -6475  84 -6478 0

c  0-1 --> -1
c    (-b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧ -p_84) -> ( b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0)
c  in CNF:
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨  b^{3, 29}_2
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_1
c     b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨  b^{3, 29}_0
c  in DIMACS:
 6473  6474  6475  84  6476 0
 6473  6474  6475  84 -6477 0
 6473  6474  6475  84  6478 0

c  -1-1 --> -2
c    ( b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧  b^{3, 28}_0 ∧ -p_84) -> ( b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0)
c  in CNF:
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨  b^{3, 29}_2
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨  b^{3, 29}_1
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨  p_84 ∨ -b^{3, 29}_0
c  in DIMACS:
-6473  6474 -6475  84  6476 0
-6473  6474 -6475  84  6477 0
-6473  6474 -6475  84 -6478 0

c  -2-1 --> break 
c    ( b^{3, 28}_2 ∧  b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨  b^{3, 28}_0 ∨  p_84 ∨ break
c  in DIMACS:
-6473 -6474  6475  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 28}_2 ∧ -b^{3, 28}_1 ∧ -b^{3, 28}_0 ∧ true) 
c  in CNF:
c    -b^{3, 28}_2 ∨  b^{3, 28}_1 ∨  b^{3, 28}_0 ∨ false 
c  in DIMACS:
-6473  6474  6475  0

c  3 does not represent an automaton state.
c    -(-b^{3, 28}_2 ∧  b^{3, 28}_1 ∧  b^{3, 28}_0 ∧ true) 
c  in CNF:
c     b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ false 
c  in DIMACS:
 6473 -6474 -6475  0
c  -3 does not represent an automaton state.
c    -( b^{3, 28}_2 ∧  b^{3, 28}_1 ∧  b^{3, 28}_0 ∧ true) 
c  in CNF:
c    -b^{3, 28}_2 ∨ -b^{3, 28}_1 ∨ -b^{3, 28}_0 ∨ false 
c  in DIMACS:
-6473 -6474 -6475  0

c i = 29
c  -2+1 --> -1
c    ( b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧  p_87) -> ( b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0)
c  in CNF:
c    -b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨  b^{3, 30}_2
c    -b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_1
c    -b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨  b^{3, 30}_0
c  in DIMACS:
-6476 -6477  6478 -87  6479 0
-6476 -6477  6478 -87 -6480 0
-6476 -6477  6478 -87  6481 0

c  -1+1 --> 0
c    ( b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0 ∧  p_87) -> (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧ -b^{3, 30}_0)
c  in CNF:
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_2
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_1
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_0
c  in DIMACS:
-6476  6477 -6478 -87 -6479 0
-6476  6477 -6478 -87 -6480 0
-6476  6477 -6478 -87 -6481 0

c  0+1 --> 1
c    (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧  p_87) -> (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0)
c  in CNF:
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_2
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_1
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨  b^{3, 30}_0
c  in DIMACS:
 6476  6477  6478 -87 -6479 0
 6476  6477  6478 -87 -6480 0
 6476  6477  6478 -87  6481 0

c  1+1 --> 2
c    (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0 ∧  p_87) -> (-b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0)
c  in CNF:
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_2
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨  b^{3, 30}_1
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ -p_87 ∨ -b^{3, 30}_0
c  in DIMACS:
 6476  6477 -6478 -87 -6479 0
 6476  6477 -6478 -87  6480 0
 6476  6477 -6478 -87 -6481 0

c  2+1 --> break 
c    (-b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧  p_87) -> break
c  in CNF:
c     b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ -p_87 ∨ break
c  in DIMACS:
 6476 -6477  6478 -87 1162 0


c  2-1 --> 1
c    (-b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧ -p_87) -> (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0)
c  in CNF:
c     b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_2
c     b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_1
c     b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨  b^{3, 30}_0
c  in DIMACS:
 6476 -6477  6478  87 -6479 0
 6476 -6477  6478  87 -6480 0
 6476 -6477  6478  87  6481 0

c  1-1 --> 0
c    (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0 ∧ -p_87) -> (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧ -b^{3, 30}_0)
c  in CNF:
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_2
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_1
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_0
c  in DIMACS:
 6476  6477 -6478  87 -6479 0
 6476  6477 -6478  87 -6480 0
 6476  6477 -6478  87 -6481 0

c  0-1 --> -1
c    (-b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧ -p_87) -> ( b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0)
c  in CNF:
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨  b^{3, 30}_2
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_1
c     b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨  b^{3, 30}_0
c  in DIMACS:
 6476  6477  6478  87  6479 0
 6476  6477  6478  87 -6480 0
 6476  6477  6478  87  6481 0

c  -1-1 --> -2
c    ( b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧  b^{3, 29}_0 ∧ -p_87) -> ( b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0)
c  in CNF:
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨  b^{3, 30}_2
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨  b^{3, 30}_1
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨  p_87 ∨ -b^{3, 30}_0
c  in DIMACS:
-6476  6477 -6478  87  6479 0
-6476  6477 -6478  87  6480 0
-6476  6477 -6478  87 -6481 0

c  -2-1 --> break 
c    ( b^{3, 29}_2 ∧  b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧ -p_87) -> break
c  in CNF:
c    -b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨  b^{3, 29}_0 ∨  p_87 ∨ break
c  in DIMACS:
-6476 -6477  6478  87 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 29}_2 ∧ -b^{3, 29}_1 ∧ -b^{3, 29}_0 ∧ true) 
c  in CNF:
c    -b^{3, 29}_2 ∨  b^{3, 29}_1 ∨  b^{3, 29}_0 ∨ false 
c  in DIMACS:
-6476  6477  6478  0

c  3 does not represent an automaton state.
c    -(-b^{3, 29}_2 ∧  b^{3, 29}_1 ∧  b^{3, 29}_0 ∧ true) 
c  in CNF:
c     b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ false 
c  in DIMACS:
 6476 -6477 -6478  0
c  -3 does not represent an automaton state.
c    -( b^{3, 29}_2 ∧  b^{3, 29}_1 ∧  b^{3, 29}_0 ∧ true) 
c  in CNF:
c    -b^{3, 29}_2 ∨ -b^{3, 29}_1 ∨ -b^{3, 29}_0 ∨ false 
c  in DIMACS:
-6476 -6477 -6478  0

c i = 30
c  -2+1 --> -1
c    ( b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧  p_90) -> ( b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0)
c  in CNF:
c    -b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨  b^{3, 31}_2
c    -b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_1
c    -b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨  b^{3, 31}_0
c  in DIMACS:
-6479 -6480  6481 -90  6482 0
-6479 -6480  6481 -90 -6483 0
-6479 -6480  6481 -90  6484 0

c  -1+1 --> 0
c    ( b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0 ∧  p_90) -> (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧ -b^{3, 31}_0)
c  in CNF:
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_2
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_1
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_0
c  in DIMACS:
-6479  6480 -6481 -90 -6482 0
-6479  6480 -6481 -90 -6483 0
-6479  6480 -6481 -90 -6484 0

c  0+1 --> 1
c    (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧  p_90) -> (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0)
c  in CNF:
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_2
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_1
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨  b^{3, 31}_0
c  in DIMACS:
 6479  6480  6481 -90 -6482 0
 6479  6480  6481 -90 -6483 0
 6479  6480  6481 -90  6484 0

c  1+1 --> 2
c    (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0 ∧  p_90) -> (-b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0)
c  in CNF:
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_2
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨  b^{3, 31}_1
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ -p_90 ∨ -b^{3, 31}_0
c  in DIMACS:
 6479  6480 -6481 -90 -6482 0
 6479  6480 -6481 -90  6483 0
 6479  6480 -6481 -90 -6484 0

c  2+1 --> break 
c    (-b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧  p_90) -> break
c  in CNF:
c     b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 6479 -6480  6481 -90 1162 0


c  2-1 --> 1
c    (-b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧ -p_90) -> (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0)
c  in CNF:
c     b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_2
c     b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_1
c     b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨  b^{3, 31}_0
c  in DIMACS:
 6479 -6480  6481  90 -6482 0
 6479 -6480  6481  90 -6483 0
 6479 -6480  6481  90  6484 0

c  1-1 --> 0
c    (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0 ∧ -p_90) -> (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧ -b^{3, 31}_0)
c  in CNF:
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_2
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_1
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_0
c  in DIMACS:
 6479  6480 -6481  90 -6482 0
 6479  6480 -6481  90 -6483 0
 6479  6480 -6481  90 -6484 0

c  0-1 --> -1
c    (-b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧ -p_90) -> ( b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0)
c  in CNF:
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨  b^{3, 31}_2
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_1
c     b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨  b^{3, 31}_0
c  in DIMACS:
 6479  6480  6481  90  6482 0
 6479  6480  6481  90 -6483 0
 6479  6480  6481  90  6484 0

c  -1-1 --> -2
c    ( b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧  b^{3, 30}_0 ∧ -p_90) -> ( b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0)
c  in CNF:
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨  b^{3, 31}_2
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨  b^{3, 31}_1
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨  p_90 ∨ -b^{3, 31}_0
c  in DIMACS:
-6479  6480 -6481  90  6482 0
-6479  6480 -6481  90  6483 0
-6479  6480 -6481  90 -6484 0

c  -2-1 --> break 
c    ( b^{3, 30}_2 ∧  b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨  b^{3, 30}_0 ∨  p_90 ∨ break
c  in DIMACS:
-6479 -6480  6481  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 30}_2 ∧ -b^{3, 30}_1 ∧ -b^{3, 30}_0 ∧ true) 
c  in CNF:
c    -b^{3, 30}_2 ∨  b^{3, 30}_1 ∨  b^{3, 30}_0 ∨ false 
c  in DIMACS:
-6479  6480  6481  0

c  3 does not represent an automaton state.
c    -(-b^{3, 30}_2 ∧  b^{3, 30}_1 ∧  b^{3, 30}_0 ∧ true) 
c  in CNF:
c     b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ false 
c  in DIMACS:
 6479 -6480 -6481  0
c  -3 does not represent an automaton state.
c    -( b^{3, 30}_2 ∧  b^{3, 30}_1 ∧  b^{3, 30}_0 ∧ true) 
c  in CNF:
c    -b^{3, 30}_2 ∨ -b^{3, 30}_1 ∨ -b^{3, 30}_0 ∨ false 
c  in DIMACS:
-6479 -6480 -6481  0

c i = 31
c  -2+1 --> -1
c    ( b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧  p_93) -> ( b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0)
c  in CNF:
c    -b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨  b^{3, 32}_2
c    -b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_1
c    -b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨  b^{3, 32}_0
c  in DIMACS:
-6482 -6483  6484 -93  6485 0
-6482 -6483  6484 -93 -6486 0
-6482 -6483  6484 -93  6487 0

c  -1+1 --> 0
c    ( b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0 ∧  p_93) -> (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧ -b^{3, 32}_0)
c  in CNF:
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_2
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_1
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_0
c  in DIMACS:
-6482  6483 -6484 -93 -6485 0
-6482  6483 -6484 -93 -6486 0
-6482  6483 -6484 -93 -6487 0

c  0+1 --> 1
c    (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧  p_93) -> (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0)
c  in CNF:
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_2
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_1
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨  b^{3, 32}_0
c  in DIMACS:
 6482  6483  6484 -93 -6485 0
 6482  6483  6484 -93 -6486 0
 6482  6483  6484 -93  6487 0

c  1+1 --> 2
c    (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0 ∧  p_93) -> (-b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0)
c  in CNF:
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_2
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨  b^{3, 32}_1
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ -p_93 ∨ -b^{3, 32}_0
c  in DIMACS:
 6482  6483 -6484 -93 -6485 0
 6482  6483 -6484 -93  6486 0
 6482  6483 -6484 -93 -6487 0

c  2+1 --> break 
c    (-b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧  p_93) -> break
c  in CNF:
c     b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ -p_93 ∨ break
c  in DIMACS:
 6482 -6483  6484 -93 1162 0


c  2-1 --> 1
c    (-b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧ -p_93) -> (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0)
c  in CNF:
c     b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_2
c     b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_1
c     b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨  b^{3, 32}_0
c  in DIMACS:
 6482 -6483  6484  93 -6485 0
 6482 -6483  6484  93 -6486 0
 6482 -6483  6484  93  6487 0

c  1-1 --> 0
c    (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0 ∧ -p_93) -> (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧ -b^{3, 32}_0)
c  in CNF:
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_2
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_1
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_0
c  in DIMACS:
 6482  6483 -6484  93 -6485 0
 6482  6483 -6484  93 -6486 0
 6482  6483 -6484  93 -6487 0

c  0-1 --> -1
c    (-b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧ -p_93) -> ( b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0)
c  in CNF:
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨  b^{3, 32}_2
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_1
c     b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨  b^{3, 32}_0
c  in DIMACS:
 6482  6483  6484  93  6485 0
 6482  6483  6484  93 -6486 0
 6482  6483  6484  93  6487 0

c  -1-1 --> -2
c    ( b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧  b^{3, 31}_0 ∧ -p_93) -> ( b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0)
c  in CNF:
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨  b^{3, 32}_2
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨  b^{3, 32}_1
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨  p_93 ∨ -b^{3, 32}_0
c  in DIMACS:
-6482  6483 -6484  93  6485 0
-6482  6483 -6484  93  6486 0
-6482  6483 -6484  93 -6487 0

c  -2-1 --> break 
c    ( b^{3, 31}_2 ∧  b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧ -p_93) -> break
c  in CNF:
c    -b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨  b^{3, 31}_0 ∨  p_93 ∨ break
c  in DIMACS:
-6482 -6483  6484  93 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 31}_2 ∧ -b^{3, 31}_1 ∧ -b^{3, 31}_0 ∧ true) 
c  in CNF:
c    -b^{3, 31}_2 ∨  b^{3, 31}_1 ∨  b^{3, 31}_0 ∨ false 
c  in DIMACS:
-6482  6483  6484  0

c  3 does not represent an automaton state.
c    -(-b^{3, 31}_2 ∧  b^{3, 31}_1 ∧  b^{3, 31}_0 ∧ true) 
c  in CNF:
c     b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ false 
c  in DIMACS:
 6482 -6483 -6484  0
c  -3 does not represent an automaton state.
c    -( b^{3, 31}_2 ∧  b^{3, 31}_1 ∧  b^{3, 31}_0 ∧ true) 
c  in CNF:
c    -b^{3, 31}_2 ∨ -b^{3, 31}_1 ∨ -b^{3, 31}_0 ∨ false 
c  in DIMACS:
-6482 -6483 -6484  0

c i = 32
c  -2+1 --> -1
c    ( b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧  p_96) -> ( b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0)
c  in CNF:
c    -b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨  b^{3, 33}_2
c    -b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_1
c    -b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨  b^{3, 33}_0
c  in DIMACS:
-6485 -6486  6487 -96  6488 0
-6485 -6486  6487 -96 -6489 0
-6485 -6486  6487 -96  6490 0

c  -1+1 --> 0
c    ( b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0 ∧  p_96) -> (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧ -b^{3, 33}_0)
c  in CNF:
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_2
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_1
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_0
c  in DIMACS:
-6485  6486 -6487 -96 -6488 0
-6485  6486 -6487 -96 -6489 0
-6485  6486 -6487 -96 -6490 0

c  0+1 --> 1
c    (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧  p_96) -> (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0)
c  in CNF:
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_2
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_1
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨  b^{3, 33}_0
c  in DIMACS:
 6485  6486  6487 -96 -6488 0
 6485  6486  6487 -96 -6489 0
 6485  6486  6487 -96  6490 0

c  1+1 --> 2
c    (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0 ∧  p_96) -> (-b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0)
c  in CNF:
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_2
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨  b^{3, 33}_1
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ -p_96 ∨ -b^{3, 33}_0
c  in DIMACS:
 6485  6486 -6487 -96 -6488 0
 6485  6486 -6487 -96  6489 0
 6485  6486 -6487 -96 -6490 0

c  2+1 --> break 
c    (-b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧  p_96) -> break
c  in CNF:
c     b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 6485 -6486  6487 -96 1162 0


c  2-1 --> 1
c    (-b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧ -p_96) -> (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0)
c  in CNF:
c     b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_2
c     b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_1
c     b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨  b^{3, 33}_0
c  in DIMACS:
 6485 -6486  6487  96 -6488 0
 6485 -6486  6487  96 -6489 0
 6485 -6486  6487  96  6490 0

c  1-1 --> 0
c    (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0 ∧ -p_96) -> (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧ -b^{3, 33}_0)
c  in CNF:
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_2
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_1
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_0
c  in DIMACS:
 6485  6486 -6487  96 -6488 0
 6485  6486 -6487  96 -6489 0
 6485  6486 -6487  96 -6490 0

c  0-1 --> -1
c    (-b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧ -p_96) -> ( b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0)
c  in CNF:
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨  b^{3, 33}_2
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_1
c     b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨  b^{3, 33}_0
c  in DIMACS:
 6485  6486  6487  96  6488 0
 6485  6486  6487  96 -6489 0
 6485  6486  6487  96  6490 0

c  -1-1 --> -2
c    ( b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧  b^{3, 32}_0 ∧ -p_96) -> ( b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0)
c  in CNF:
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨  b^{3, 33}_2
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨  b^{3, 33}_1
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨  p_96 ∨ -b^{3, 33}_0
c  in DIMACS:
-6485  6486 -6487  96  6488 0
-6485  6486 -6487  96  6489 0
-6485  6486 -6487  96 -6490 0

c  -2-1 --> break 
c    ( b^{3, 32}_2 ∧  b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨  b^{3, 32}_0 ∨  p_96 ∨ break
c  in DIMACS:
-6485 -6486  6487  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 32}_2 ∧ -b^{3, 32}_1 ∧ -b^{3, 32}_0 ∧ true) 
c  in CNF:
c    -b^{3, 32}_2 ∨  b^{3, 32}_1 ∨  b^{3, 32}_0 ∨ false 
c  in DIMACS:
-6485  6486  6487  0

c  3 does not represent an automaton state.
c    -(-b^{3, 32}_2 ∧  b^{3, 32}_1 ∧  b^{3, 32}_0 ∧ true) 
c  in CNF:
c     b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ false 
c  in DIMACS:
 6485 -6486 -6487  0
c  -3 does not represent an automaton state.
c    -( b^{3, 32}_2 ∧  b^{3, 32}_1 ∧  b^{3, 32}_0 ∧ true) 
c  in CNF:
c    -b^{3, 32}_2 ∨ -b^{3, 32}_1 ∨ -b^{3, 32}_0 ∨ false 
c  in DIMACS:
-6485 -6486 -6487  0

c i = 33
c  -2+1 --> -1
c    ( b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧  p_99) -> ( b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0)
c  in CNF:
c    -b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨  b^{3, 34}_2
c    -b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_1
c    -b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨  b^{3, 34}_0
c  in DIMACS:
-6488 -6489  6490 -99  6491 0
-6488 -6489  6490 -99 -6492 0
-6488 -6489  6490 -99  6493 0

c  -1+1 --> 0
c    ( b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0 ∧  p_99) -> (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧ -b^{3, 34}_0)
c  in CNF:
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_2
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_1
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_0
c  in DIMACS:
-6488  6489 -6490 -99 -6491 0
-6488  6489 -6490 -99 -6492 0
-6488  6489 -6490 -99 -6493 0

c  0+1 --> 1
c    (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧  p_99) -> (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0)
c  in CNF:
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_2
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_1
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨  b^{3, 34}_0
c  in DIMACS:
 6488  6489  6490 -99 -6491 0
 6488  6489  6490 -99 -6492 0
 6488  6489  6490 -99  6493 0

c  1+1 --> 2
c    (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0 ∧  p_99) -> (-b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0)
c  in CNF:
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_2
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨  b^{3, 34}_1
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ -p_99 ∨ -b^{3, 34}_0
c  in DIMACS:
 6488  6489 -6490 -99 -6491 0
 6488  6489 -6490 -99  6492 0
 6488  6489 -6490 -99 -6493 0

c  2+1 --> break 
c    (-b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧  p_99) -> break
c  in CNF:
c     b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 6488 -6489  6490 -99 1162 0


c  2-1 --> 1
c    (-b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧ -p_99) -> (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0)
c  in CNF:
c     b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_2
c     b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_1
c     b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨  b^{3, 34}_0
c  in DIMACS:
 6488 -6489  6490  99 -6491 0
 6488 -6489  6490  99 -6492 0
 6488 -6489  6490  99  6493 0

c  1-1 --> 0
c    (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0 ∧ -p_99) -> (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧ -b^{3, 34}_0)
c  in CNF:
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_2
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_1
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_0
c  in DIMACS:
 6488  6489 -6490  99 -6491 0
 6488  6489 -6490  99 -6492 0
 6488  6489 -6490  99 -6493 0

c  0-1 --> -1
c    (-b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧ -p_99) -> ( b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0)
c  in CNF:
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨  b^{3, 34}_2
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_1
c     b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨  b^{3, 34}_0
c  in DIMACS:
 6488  6489  6490  99  6491 0
 6488  6489  6490  99 -6492 0
 6488  6489  6490  99  6493 0

c  -1-1 --> -2
c    ( b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧  b^{3, 33}_0 ∧ -p_99) -> ( b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0)
c  in CNF:
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨  b^{3, 34}_2
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨  b^{3, 34}_1
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨  p_99 ∨ -b^{3, 34}_0
c  in DIMACS:
-6488  6489 -6490  99  6491 0
-6488  6489 -6490  99  6492 0
-6488  6489 -6490  99 -6493 0

c  -2-1 --> break 
c    ( b^{3, 33}_2 ∧  b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨  b^{3, 33}_0 ∨  p_99 ∨ break
c  in DIMACS:
-6488 -6489  6490  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 33}_2 ∧ -b^{3, 33}_1 ∧ -b^{3, 33}_0 ∧ true) 
c  in CNF:
c    -b^{3, 33}_2 ∨  b^{3, 33}_1 ∨  b^{3, 33}_0 ∨ false 
c  in DIMACS:
-6488  6489  6490  0

c  3 does not represent an automaton state.
c    -(-b^{3, 33}_2 ∧  b^{3, 33}_1 ∧  b^{3, 33}_0 ∧ true) 
c  in CNF:
c     b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ false 
c  in DIMACS:
 6488 -6489 -6490  0
c  -3 does not represent an automaton state.
c    -( b^{3, 33}_2 ∧  b^{3, 33}_1 ∧  b^{3, 33}_0 ∧ true) 
c  in CNF:
c    -b^{3, 33}_2 ∨ -b^{3, 33}_1 ∨ -b^{3, 33}_0 ∨ false 
c  in DIMACS:
-6488 -6489 -6490  0

c i = 34
c  -2+1 --> -1
c    ( b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧  p_102) -> ( b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0)
c  in CNF:
c    -b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨  b^{3, 35}_2
c    -b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_1
c    -b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨  b^{3, 35}_0
c  in DIMACS:
-6491 -6492  6493 -102  6494 0
-6491 -6492  6493 -102 -6495 0
-6491 -6492  6493 -102  6496 0

c  -1+1 --> 0
c    ( b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0 ∧  p_102) -> (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧ -b^{3, 35}_0)
c  in CNF:
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_2
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_1
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_0
c  in DIMACS:
-6491  6492 -6493 -102 -6494 0
-6491  6492 -6493 -102 -6495 0
-6491  6492 -6493 -102 -6496 0

c  0+1 --> 1
c    (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧  p_102) -> (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0)
c  in CNF:
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_2
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_1
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨  b^{3, 35}_0
c  in DIMACS:
 6491  6492  6493 -102 -6494 0
 6491  6492  6493 -102 -6495 0
 6491  6492  6493 -102  6496 0

c  1+1 --> 2
c    (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0 ∧  p_102) -> (-b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0)
c  in CNF:
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_2
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨  b^{3, 35}_1
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ -p_102 ∨ -b^{3, 35}_0
c  in DIMACS:
 6491  6492 -6493 -102 -6494 0
 6491  6492 -6493 -102  6495 0
 6491  6492 -6493 -102 -6496 0

c  2+1 --> break 
c    (-b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧  p_102) -> break
c  in CNF:
c     b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 6491 -6492  6493 -102 1162 0


c  2-1 --> 1
c    (-b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧ -p_102) -> (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0)
c  in CNF:
c     b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_2
c     b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_1
c     b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨  b^{3, 35}_0
c  in DIMACS:
 6491 -6492  6493  102 -6494 0
 6491 -6492  6493  102 -6495 0
 6491 -6492  6493  102  6496 0

c  1-1 --> 0
c    (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0 ∧ -p_102) -> (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧ -b^{3, 35}_0)
c  in CNF:
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_2
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_1
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_0
c  in DIMACS:
 6491  6492 -6493  102 -6494 0
 6491  6492 -6493  102 -6495 0
 6491  6492 -6493  102 -6496 0

c  0-1 --> -1
c    (-b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧ -p_102) -> ( b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0)
c  in CNF:
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨  b^{3, 35}_2
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_1
c     b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨  b^{3, 35}_0
c  in DIMACS:
 6491  6492  6493  102  6494 0
 6491  6492  6493  102 -6495 0
 6491  6492  6493  102  6496 0

c  -1-1 --> -2
c    ( b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧  b^{3, 34}_0 ∧ -p_102) -> ( b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0)
c  in CNF:
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨  b^{3, 35}_2
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨  b^{3, 35}_1
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨  p_102 ∨ -b^{3, 35}_0
c  in DIMACS:
-6491  6492 -6493  102  6494 0
-6491  6492 -6493  102  6495 0
-6491  6492 -6493  102 -6496 0

c  -2-1 --> break 
c    ( b^{3, 34}_2 ∧  b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨  b^{3, 34}_0 ∨  p_102 ∨ break
c  in DIMACS:
-6491 -6492  6493  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 34}_2 ∧ -b^{3, 34}_1 ∧ -b^{3, 34}_0 ∧ true) 
c  in CNF:
c    -b^{3, 34}_2 ∨  b^{3, 34}_1 ∨  b^{3, 34}_0 ∨ false 
c  in DIMACS:
-6491  6492  6493  0

c  3 does not represent an automaton state.
c    -(-b^{3, 34}_2 ∧  b^{3, 34}_1 ∧  b^{3, 34}_0 ∧ true) 
c  in CNF:
c     b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ false 
c  in DIMACS:
 6491 -6492 -6493  0
c  -3 does not represent an automaton state.
c    -( b^{3, 34}_2 ∧  b^{3, 34}_1 ∧  b^{3, 34}_0 ∧ true) 
c  in CNF:
c    -b^{3, 34}_2 ∨ -b^{3, 34}_1 ∨ -b^{3, 34}_0 ∨ false 
c  in DIMACS:
-6491 -6492 -6493  0

c i = 35
c  -2+1 --> -1
c    ( b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧  p_105) -> ( b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0)
c  in CNF:
c    -b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨  b^{3, 36}_2
c    -b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_1
c    -b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨  b^{3, 36}_0
c  in DIMACS:
-6494 -6495  6496 -105  6497 0
-6494 -6495  6496 -105 -6498 0
-6494 -6495  6496 -105  6499 0

c  -1+1 --> 0
c    ( b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0 ∧  p_105) -> (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧ -b^{3, 36}_0)
c  in CNF:
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_2
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_1
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_0
c  in DIMACS:
-6494  6495 -6496 -105 -6497 0
-6494  6495 -6496 -105 -6498 0
-6494  6495 -6496 -105 -6499 0

c  0+1 --> 1
c    (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧  p_105) -> (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0)
c  in CNF:
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_2
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_1
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨  b^{3, 36}_0
c  in DIMACS:
 6494  6495  6496 -105 -6497 0
 6494  6495  6496 -105 -6498 0
 6494  6495  6496 -105  6499 0

c  1+1 --> 2
c    (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0 ∧  p_105) -> (-b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0)
c  in CNF:
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_2
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨  b^{3, 36}_1
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ -p_105 ∨ -b^{3, 36}_0
c  in DIMACS:
 6494  6495 -6496 -105 -6497 0
 6494  6495 -6496 -105  6498 0
 6494  6495 -6496 -105 -6499 0

c  2+1 --> break 
c    (-b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧  p_105) -> break
c  in CNF:
c     b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 6494 -6495  6496 -105 1162 0


c  2-1 --> 1
c    (-b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧ -p_105) -> (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0)
c  in CNF:
c     b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_2
c     b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_1
c     b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨  b^{3, 36}_0
c  in DIMACS:
 6494 -6495  6496  105 -6497 0
 6494 -6495  6496  105 -6498 0
 6494 -6495  6496  105  6499 0

c  1-1 --> 0
c    (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0 ∧ -p_105) -> (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧ -b^{3, 36}_0)
c  in CNF:
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_2
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_1
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_0
c  in DIMACS:
 6494  6495 -6496  105 -6497 0
 6494  6495 -6496  105 -6498 0
 6494  6495 -6496  105 -6499 0

c  0-1 --> -1
c    (-b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧ -p_105) -> ( b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0)
c  in CNF:
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨  b^{3, 36}_2
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_1
c     b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨  b^{3, 36}_0
c  in DIMACS:
 6494  6495  6496  105  6497 0
 6494  6495  6496  105 -6498 0
 6494  6495  6496  105  6499 0

c  -1-1 --> -2
c    ( b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧  b^{3, 35}_0 ∧ -p_105) -> ( b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0)
c  in CNF:
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨  b^{3, 36}_2
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨  b^{3, 36}_1
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨  p_105 ∨ -b^{3, 36}_0
c  in DIMACS:
-6494  6495 -6496  105  6497 0
-6494  6495 -6496  105  6498 0
-6494  6495 -6496  105 -6499 0

c  -2-1 --> break 
c    ( b^{3, 35}_2 ∧  b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨  b^{3, 35}_0 ∨  p_105 ∨ break
c  in DIMACS:
-6494 -6495  6496  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 35}_2 ∧ -b^{3, 35}_1 ∧ -b^{3, 35}_0 ∧ true) 
c  in CNF:
c    -b^{3, 35}_2 ∨  b^{3, 35}_1 ∨  b^{3, 35}_0 ∨ false 
c  in DIMACS:
-6494  6495  6496  0

c  3 does not represent an automaton state.
c    -(-b^{3, 35}_2 ∧  b^{3, 35}_1 ∧  b^{3, 35}_0 ∧ true) 
c  in CNF:
c     b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ false 
c  in DIMACS:
 6494 -6495 -6496  0
c  -3 does not represent an automaton state.
c    -( b^{3, 35}_2 ∧  b^{3, 35}_1 ∧  b^{3, 35}_0 ∧ true) 
c  in CNF:
c    -b^{3, 35}_2 ∨ -b^{3, 35}_1 ∨ -b^{3, 35}_0 ∨ false 
c  in DIMACS:
-6494 -6495 -6496  0

c i = 36
c  -2+1 --> -1
c    ( b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧  p_108) -> ( b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0)
c  in CNF:
c    -b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨  b^{3, 37}_2
c    -b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_1
c    -b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨  b^{3, 37}_0
c  in DIMACS:
-6497 -6498  6499 -108  6500 0
-6497 -6498  6499 -108 -6501 0
-6497 -6498  6499 -108  6502 0

c  -1+1 --> 0
c    ( b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0 ∧  p_108) -> (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧ -b^{3, 37}_0)
c  in CNF:
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_2
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_1
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_0
c  in DIMACS:
-6497  6498 -6499 -108 -6500 0
-6497  6498 -6499 -108 -6501 0
-6497  6498 -6499 -108 -6502 0

c  0+1 --> 1
c    (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧  p_108) -> (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0)
c  in CNF:
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_2
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_1
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨  b^{3, 37}_0
c  in DIMACS:
 6497  6498  6499 -108 -6500 0
 6497  6498  6499 -108 -6501 0
 6497  6498  6499 -108  6502 0

c  1+1 --> 2
c    (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0 ∧  p_108) -> (-b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0)
c  in CNF:
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_2
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨  b^{3, 37}_1
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ -p_108 ∨ -b^{3, 37}_0
c  in DIMACS:
 6497  6498 -6499 -108 -6500 0
 6497  6498 -6499 -108  6501 0
 6497  6498 -6499 -108 -6502 0

c  2+1 --> break 
c    (-b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧  p_108) -> break
c  in CNF:
c     b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 6497 -6498  6499 -108 1162 0


c  2-1 --> 1
c    (-b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧ -p_108) -> (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0)
c  in CNF:
c     b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_2
c     b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_1
c     b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨  b^{3, 37}_0
c  in DIMACS:
 6497 -6498  6499  108 -6500 0
 6497 -6498  6499  108 -6501 0
 6497 -6498  6499  108  6502 0

c  1-1 --> 0
c    (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0 ∧ -p_108) -> (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧ -b^{3, 37}_0)
c  in CNF:
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_2
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_1
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_0
c  in DIMACS:
 6497  6498 -6499  108 -6500 0
 6497  6498 -6499  108 -6501 0
 6497  6498 -6499  108 -6502 0

c  0-1 --> -1
c    (-b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧ -p_108) -> ( b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0)
c  in CNF:
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨  b^{3, 37}_2
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_1
c     b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨  b^{3, 37}_0
c  in DIMACS:
 6497  6498  6499  108  6500 0
 6497  6498  6499  108 -6501 0
 6497  6498  6499  108  6502 0

c  -1-1 --> -2
c    ( b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧  b^{3, 36}_0 ∧ -p_108) -> ( b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0)
c  in CNF:
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨  b^{3, 37}_2
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨  b^{3, 37}_1
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨  p_108 ∨ -b^{3, 37}_0
c  in DIMACS:
-6497  6498 -6499  108  6500 0
-6497  6498 -6499  108  6501 0
-6497  6498 -6499  108 -6502 0

c  -2-1 --> break 
c    ( b^{3, 36}_2 ∧  b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨  b^{3, 36}_0 ∨  p_108 ∨ break
c  in DIMACS:
-6497 -6498  6499  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 36}_2 ∧ -b^{3, 36}_1 ∧ -b^{3, 36}_0 ∧ true) 
c  in CNF:
c    -b^{3, 36}_2 ∨  b^{3, 36}_1 ∨  b^{3, 36}_0 ∨ false 
c  in DIMACS:
-6497  6498  6499  0

c  3 does not represent an automaton state.
c    -(-b^{3, 36}_2 ∧  b^{3, 36}_1 ∧  b^{3, 36}_0 ∧ true) 
c  in CNF:
c     b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ false 
c  in DIMACS:
 6497 -6498 -6499  0
c  -3 does not represent an automaton state.
c    -( b^{3, 36}_2 ∧  b^{3, 36}_1 ∧  b^{3, 36}_0 ∧ true) 
c  in CNF:
c    -b^{3, 36}_2 ∨ -b^{3, 36}_1 ∨ -b^{3, 36}_0 ∨ false 
c  in DIMACS:
-6497 -6498 -6499  0

c i = 37
c  -2+1 --> -1
c    ( b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧  p_111) -> ( b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0)
c  in CNF:
c    -b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨  b^{3, 38}_2
c    -b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_1
c    -b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨  b^{3, 38}_0
c  in DIMACS:
-6500 -6501  6502 -111  6503 0
-6500 -6501  6502 -111 -6504 0
-6500 -6501  6502 -111  6505 0

c  -1+1 --> 0
c    ( b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0 ∧  p_111) -> (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧ -b^{3, 38}_0)
c  in CNF:
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_2
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_1
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_0
c  in DIMACS:
-6500  6501 -6502 -111 -6503 0
-6500  6501 -6502 -111 -6504 0
-6500  6501 -6502 -111 -6505 0

c  0+1 --> 1
c    (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧  p_111) -> (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0)
c  in CNF:
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_2
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_1
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨  b^{3, 38}_0
c  in DIMACS:
 6500  6501  6502 -111 -6503 0
 6500  6501  6502 -111 -6504 0
 6500  6501  6502 -111  6505 0

c  1+1 --> 2
c    (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0 ∧  p_111) -> (-b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0)
c  in CNF:
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_2
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨  b^{3, 38}_1
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ -p_111 ∨ -b^{3, 38}_0
c  in DIMACS:
 6500  6501 -6502 -111 -6503 0
 6500  6501 -6502 -111  6504 0
 6500  6501 -6502 -111 -6505 0

c  2+1 --> break 
c    (-b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧  p_111) -> break
c  in CNF:
c     b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ -p_111 ∨ break
c  in DIMACS:
 6500 -6501  6502 -111 1162 0


c  2-1 --> 1
c    (-b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧ -p_111) -> (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0)
c  in CNF:
c     b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_2
c     b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_1
c     b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨  b^{3, 38}_0
c  in DIMACS:
 6500 -6501  6502  111 -6503 0
 6500 -6501  6502  111 -6504 0
 6500 -6501  6502  111  6505 0

c  1-1 --> 0
c    (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0 ∧ -p_111) -> (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧ -b^{3, 38}_0)
c  in CNF:
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_2
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_1
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_0
c  in DIMACS:
 6500  6501 -6502  111 -6503 0
 6500  6501 -6502  111 -6504 0
 6500  6501 -6502  111 -6505 0

c  0-1 --> -1
c    (-b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧ -p_111) -> ( b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0)
c  in CNF:
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨  b^{3, 38}_2
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_1
c     b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨  b^{3, 38}_0
c  in DIMACS:
 6500  6501  6502  111  6503 0
 6500  6501  6502  111 -6504 0
 6500  6501  6502  111  6505 0

c  -1-1 --> -2
c    ( b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧  b^{3, 37}_0 ∧ -p_111) -> ( b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0)
c  in CNF:
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨  b^{3, 38}_2
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨  b^{3, 38}_1
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨  p_111 ∨ -b^{3, 38}_0
c  in DIMACS:
-6500  6501 -6502  111  6503 0
-6500  6501 -6502  111  6504 0
-6500  6501 -6502  111 -6505 0

c  -2-1 --> break 
c    ( b^{3, 37}_2 ∧  b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧ -p_111) -> break
c  in CNF:
c    -b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨  b^{3, 37}_0 ∨  p_111 ∨ break
c  in DIMACS:
-6500 -6501  6502  111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 37}_2 ∧ -b^{3, 37}_1 ∧ -b^{3, 37}_0 ∧ true) 
c  in CNF:
c    -b^{3, 37}_2 ∨  b^{3, 37}_1 ∨  b^{3, 37}_0 ∨ false 
c  in DIMACS:
-6500  6501  6502  0

c  3 does not represent an automaton state.
c    -(-b^{3, 37}_2 ∧  b^{3, 37}_1 ∧  b^{3, 37}_0 ∧ true) 
c  in CNF:
c     b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ false 
c  in DIMACS:
 6500 -6501 -6502  0
c  -3 does not represent an automaton state.
c    -( b^{3, 37}_2 ∧  b^{3, 37}_1 ∧  b^{3, 37}_0 ∧ true) 
c  in CNF:
c    -b^{3, 37}_2 ∨ -b^{3, 37}_1 ∨ -b^{3, 37}_0 ∨ false 
c  in DIMACS:
-6500 -6501 -6502  0

c i = 38
c  -2+1 --> -1
c    ( b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧  p_114) -> ( b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0)
c  in CNF:
c    -b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨  b^{3, 39}_2
c    -b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_1
c    -b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨  b^{3, 39}_0
c  in DIMACS:
-6503 -6504  6505 -114  6506 0
-6503 -6504  6505 -114 -6507 0
-6503 -6504  6505 -114  6508 0

c  -1+1 --> 0
c    ( b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0 ∧  p_114) -> (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧ -b^{3, 39}_0)
c  in CNF:
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_2
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_1
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_0
c  in DIMACS:
-6503  6504 -6505 -114 -6506 0
-6503  6504 -6505 -114 -6507 0
-6503  6504 -6505 -114 -6508 0

c  0+1 --> 1
c    (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧  p_114) -> (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0)
c  in CNF:
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_2
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_1
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨  b^{3, 39}_0
c  in DIMACS:
 6503  6504  6505 -114 -6506 0
 6503  6504  6505 -114 -6507 0
 6503  6504  6505 -114  6508 0

c  1+1 --> 2
c    (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0 ∧  p_114) -> (-b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0)
c  in CNF:
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_2
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨  b^{3, 39}_1
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ -p_114 ∨ -b^{3, 39}_0
c  in DIMACS:
 6503  6504 -6505 -114 -6506 0
 6503  6504 -6505 -114  6507 0
 6503  6504 -6505 -114 -6508 0

c  2+1 --> break 
c    (-b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧  p_114) -> break
c  in CNF:
c     b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 6503 -6504  6505 -114 1162 0


c  2-1 --> 1
c    (-b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧ -p_114) -> (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0)
c  in CNF:
c     b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_2
c     b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_1
c     b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨  b^{3, 39}_0
c  in DIMACS:
 6503 -6504  6505  114 -6506 0
 6503 -6504  6505  114 -6507 0
 6503 -6504  6505  114  6508 0

c  1-1 --> 0
c    (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0 ∧ -p_114) -> (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧ -b^{3, 39}_0)
c  in CNF:
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_2
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_1
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_0
c  in DIMACS:
 6503  6504 -6505  114 -6506 0
 6503  6504 -6505  114 -6507 0
 6503  6504 -6505  114 -6508 0

c  0-1 --> -1
c    (-b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧ -p_114) -> ( b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0)
c  in CNF:
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨  b^{3, 39}_2
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_1
c     b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨  b^{3, 39}_0
c  in DIMACS:
 6503  6504  6505  114  6506 0
 6503  6504  6505  114 -6507 0
 6503  6504  6505  114  6508 0

c  -1-1 --> -2
c    ( b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧  b^{3, 38}_0 ∧ -p_114) -> ( b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0)
c  in CNF:
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨  b^{3, 39}_2
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨  b^{3, 39}_1
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨  p_114 ∨ -b^{3, 39}_0
c  in DIMACS:
-6503  6504 -6505  114  6506 0
-6503  6504 -6505  114  6507 0
-6503  6504 -6505  114 -6508 0

c  -2-1 --> break 
c    ( b^{3, 38}_2 ∧  b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨  b^{3, 38}_0 ∨  p_114 ∨ break
c  in DIMACS:
-6503 -6504  6505  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 38}_2 ∧ -b^{3, 38}_1 ∧ -b^{3, 38}_0 ∧ true) 
c  in CNF:
c    -b^{3, 38}_2 ∨  b^{3, 38}_1 ∨  b^{3, 38}_0 ∨ false 
c  in DIMACS:
-6503  6504  6505  0

c  3 does not represent an automaton state.
c    -(-b^{3, 38}_2 ∧  b^{3, 38}_1 ∧  b^{3, 38}_0 ∧ true) 
c  in CNF:
c     b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ false 
c  in DIMACS:
 6503 -6504 -6505  0
c  -3 does not represent an automaton state.
c    -( b^{3, 38}_2 ∧  b^{3, 38}_1 ∧  b^{3, 38}_0 ∧ true) 
c  in CNF:
c    -b^{3, 38}_2 ∨ -b^{3, 38}_1 ∨ -b^{3, 38}_0 ∨ false 
c  in DIMACS:
-6503 -6504 -6505  0

c i = 39
c  -2+1 --> -1
c    ( b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧  p_117) -> ( b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0)
c  in CNF:
c    -b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨  b^{3, 40}_2
c    -b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_1
c    -b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨  b^{3, 40}_0
c  in DIMACS:
-6506 -6507  6508 -117  6509 0
-6506 -6507  6508 -117 -6510 0
-6506 -6507  6508 -117  6511 0

c  -1+1 --> 0
c    ( b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0 ∧  p_117) -> (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧ -b^{3, 40}_0)
c  in CNF:
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_2
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_1
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_0
c  in DIMACS:
-6506  6507 -6508 -117 -6509 0
-6506  6507 -6508 -117 -6510 0
-6506  6507 -6508 -117 -6511 0

c  0+1 --> 1
c    (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧  p_117) -> (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0)
c  in CNF:
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_2
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_1
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨  b^{3, 40}_0
c  in DIMACS:
 6506  6507  6508 -117 -6509 0
 6506  6507  6508 -117 -6510 0
 6506  6507  6508 -117  6511 0

c  1+1 --> 2
c    (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0 ∧  p_117) -> (-b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0)
c  in CNF:
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_2
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨  b^{3, 40}_1
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ -p_117 ∨ -b^{3, 40}_0
c  in DIMACS:
 6506  6507 -6508 -117 -6509 0
 6506  6507 -6508 -117  6510 0
 6506  6507 -6508 -117 -6511 0

c  2+1 --> break 
c    (-b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧  p_117) -> break
c  in CNF:
c     b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 6506 -6507  6508 -117 1162 0


c  2-1 --> 1
c    (-b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧ -p_117) -> (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0)
c  in CNF:
c     b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_2
c     b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_1
c     b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨  b^{3, 40}_0
c  in DIMACS:
 6506 -6507  6508  117 -6509 0
 6506 -6507  6508  117 -6510 0
 6506 -6507  6508  117  6511 0

c  1-1 --> 0
c    (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0 ∧ -p_117) -> (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧ -b^{3, 40}_0)
c  in CNF:
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_2
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_1
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_0
c  in DIMACS:
 6506  6507 -6508  117 -6509 0
 6506  6507 -6508  117 -6510 0
 6506  6507 -6508  117 -6511 0

c  0-1 --> -1
c    (-b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧ -p_117) -> ( b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0)
c  in CNF:
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨  b^{3, 40}_2
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_1
c     b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨  b^{3, 40}_0
c  in DIMACS:
 6506  6507  6508  117  6509 0
 6506  6507  6508  117 -6510 0
 6506  6507  6508  117  6511 0

c  -1-1 --> -2
c    ( b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧  b^{3, 39}_0 ∧ -p_117) -> ( b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0)
c  in CNF:
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨  b^{3, 40}_2
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨  b^{3, 40}_1
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨  p_117 ∨ -b^{3, 40}_0
c  in DIMACS:
-6506  6507 -6508  117  6509 0
-6506  6507 -6508  117  6510 0
-6506  6507 -6508  117 -6511 0

c  -2-1 --> break 
c    ( b^{3, 39}_2 ∧  b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨  b^{3, 39}_0 ∨  p_117 ∨ break
c  in DIMACS:
-6506 -6507  6508  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 39}_2 ∧ -b^{3, 39}_1 ∧ -b^{3, 39}_0 ∧ true) 
c  in CNF:
c    -b^{3, 39}_2 ∨  b^{3, 39}_1 ∨  b^{3, 39}_0 ∨ false 
c  in DIMACS:
-6506  6507  6508  0

c  3 does not represent an automaton state.
c    -(-b^{3, 39}_2 ∧  b^{3, 39}_1 ∧  b^{3, 39}_0 ∧ true) 
c  in CNF:
c     b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ false 
c  in DIMACS:
 6506 -6507 -6508  0
c  -3 does not represent an automaton state.
c    -( b^{3, 39}_2 ∧  b^{3, 39}_1 ∧  b^{3, 39}_0 ∧ true) 
c  in CNF:
c    -b^{3, 39}_2 ∨ -b^{3, 39}_1 ∨ -b^{3, 39}_0 ∨ false 
c  in DIMACS:
-6506 -6507 -6508  0

c i = 40
c  -2+1 --> -1
c    ( b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧  p_120) -> ( b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0)
c  in CNF:
c    -b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨  b^{3, 41}_2
c    -b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_1
c    -b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨  b^{3, 41}_0
c  in DIMACS:
-6509 -6510  6511 -120  6512 0
-6509 -6510  6511 -120 -6513 0
-6509 -6510  6511 -120  6514 0

c  -1+1 --> 0
c    ( b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0 ∧  p_120) -> (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧ -b^{3, 41}_0)
c  in CNF:
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_2
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_1
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_0
c  in DIMACS:
-6509  6510 -6511 -120 -6512 0
-6509  6510 -6511 -120 -6513 0
-6509  6510 -6511 -120 -6514 0

c  0+1 --> 1
c    (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧  p_120) -> (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0)
c  in CNF:
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_2
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_1
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨  b^{3, 41}_0
c  in DIMACS:
 6509  6510  6511 -120 -6512 0
 6509  6510  6511 -120 -6513 0
 6509  6510  6511 -120  6514 0

c  1+1 --> 2
c    (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0 ∧  p_120) -> (-b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0)
c  in CNF:
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_2
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨  b^{3, 41}_1
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ -p_120 ∨ -b^{3, 41}_0
c  in DIMACS:
 6509  6510 -6511 -120 -6512 0
 6509  6510 -6511 -120  6513 0
 6509  6510 -6511 -120 -6514 0

c  2+1 --> break 
c    (-b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧  p_120) -> break
c  in CNF:
c     b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 6509 -6510  6511 -120 1162 0


c  2-1 --> 1
c    (-b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧ -p_120) -> (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0)
c  in CNF:
c     b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_2
c     b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_1
c     b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨  b^{3, 41}_0
c  in DIMACS:
 6509 -6510  6511  120 -6512 0
 6509 -6510  6511  120 -6513 0
 6509 -6510  6511  120  6514 0

c  1-1 --> 0
c    (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0 ∧ -p_120) -> (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧ -b^{3, 41}_0)
c  in CNF:
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_2
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_1
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_0
c  in DIMACS:
 6509  6510 -6511  120 -6512 0
 6509  6510 -6511  120 -6513 0
 6509  6510 -6511  120 -6514 0

c  0-1 --> -1
c    (-b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧ -p_120) -> ( b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0)
c  in CNF:
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨  b^{3, 41}_2
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_1
c     b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨  b^{3, 41}_0
c  in DIMACS:
 6509  6510  6511  120  6512 0
 6509  6510  6511  120 -6513 0
 6509  6510  6511  120  6514 0

c  -1-1 --> -2
c    ( b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧  b^{3, 40}_0 ∧ -p_120) -> ( b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0)
c  in CNF:
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨  b^{3, 41}_2
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨  b^{3, 41}_1
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨  p_120 ∨ -b^{3, 41}_0
c  in DIMACS:
-6509  6510 -6511  120  6512 0
-6509  6510 -6511  120  6513 0
-6509  6510 -6511  120 -6514 0

c  -2-1 --> break 
c    ( b^{3, 40}_2 ∧  b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨  b^{3, 40}_0 ∨  p_120 ∨ break
c  in DIMACS:
-6509 -6510  6511  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 40}_2 ∧ -b^{3, 40}_1 ∧ -b^{3, 40}_0 ∧ true) 
c  in CNF:
c    -b^{3, 40}_2 ∨  b^{3, 40}_1 ∨  b^{3, 40}_0 ∨ false 
c  in DIMACS:
-6509  6510  6511  0

c  3 does not represent an automaton state.
c    -(-b^{3, 40}_2 ∧  b^{3, 40}_1 ∧  b^{3, 40}_0 ∧ true) 
c  in CNF:
c     b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ false 
c  in DIMACS:
 6509 -6510 -6511  0
c  -3 does not represent an automaton state.
c    -( b^{3, 40}_2 ∧  b^{3, 40}_1 ∧  b^{3, 40}_0 ∧ true) 
c  in CNF:
c    -b^{3, 40}_2 ∨ -b^{3, 40}_1 ∨ -b^{3, 40}_0 ∨ false 
c  in DIMACS:
-6509 -6510 -6511  0

c i = 41
c  -2+1 --> -1
c    ( b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧  p_123) -> ( b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0)
c  in CNF:
c    -b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨  b^{3, 42}_2
c    -b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_1
c    -b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨  b^{3, 42}_0
c  in DIMACS:
-6512 -6513  6514 -123  6515 0
-6512 -6513  6514 -123 -6516 0
-6512 -6513  6514 -123  6517 0

c  -1+1 --> 0
c    ( b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0 ∧  p_123) -> (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧ -b^{3, 42}_0)
c  in CNF:
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_2
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_1
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_0
c  in DIMACS:
-6512  6513 -6514 -123 -6515 0
-6512  6513 -6514 -123 -6516 0
-6512  6513 -6514 -123 -6517 0

c  0+1 --> 1
c    (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧  p_123) -> (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0)
c  in CNF:
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_2
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_1
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨  b^{3, 42}_0
c  in DIMACS:
 6512  6513  6514 -123 -6515 0
 6512  6513  6514 -123 -6516 0
 6512  6513  6514 -123  6517 0

c  1+1 --> 2
c    (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0 ∧  p_123) -> (-b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0)
c  in CNF:
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_2
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨  b^{3, 42}_1
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ -p_123 ∨ -b^{3, 42}_0
c  in DIMACS:
 6512  6513 -6514 -123 -6515 0
 6512  6513 -6514 -123  6516 0
 6512  6513 -6514 -123 -6517 0

c  2+1 --> break 
c    (-b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧  p_123) -> break
c  in CNF:
c     b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ -p_123 ∨ break
c  in DIMACS:
 6512 -6513  6514 -123 1162 0


c  2-1 --> 1
c    (-b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧ -p_123) -> (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0)
c  in CNF:
c     b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_2
c     b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_1
c     b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨  b^{3, 42}_0
c  in DIMACS:
 6512 -6513  6514  123 -6515 0
 6512 -6513  6514  123 -6516 0
 6512 -6513  6514  123  6517 0

c  1-1 --> 0
c    (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0 ∧ -p_123) -> (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧ -b^{3, 42}_0)
c  in CNF:
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_2
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_1
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_0
c  in DIMACS:
 6512  6513 -6514  123 -6515 0
 6512  6513 -6514  123 -6516 0
 6512  6513 -6514  123 -6517 0

c  0-1 --> -1
c    (-b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧ -p_123) -> ( b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0)
c  in CNF:
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨  b^{3, 42}_2
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_1
c     b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨  b^{3, 42}_0
c  in DIMACS:
 6512  6513  6514  123  6515 0
 6512  6513  6514  123 -6516 0
 6512  6513  6514  123  6517 0

c  -1-1 --> -2
c    ( b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧  b^{3, 41}_0 ∧ -p_123) -> ( b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0)
c  in CNF:
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨  b^{3, 42}_2
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨  b^{3, 42}_1
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨  p_123 ∨ -b^{3, 42}_0
c  in DIMACS:
-6512  6513 -6514  123  6515 0
-6512  6513 -6514  123  6516 0
-6512  6513 -6514  123 -6517 0

c  -2-1 --> break 
c    ( b^{3, 41}_2 ∧  b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧ -p_123) -> break
c  in CNF:
c    -b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨  b^{3, 41}_0 ∨  p_123 ∨ break
c  in DIMACS:
-6512 -6513  6514  123 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 41}_2 ∧ -b^{3, 41}_1 ∧ -b^{3, 41}_0 ∧ true) 
c  in CNF:
c    -b^{3, 41}_2 ∨  b^{3, 41}_1 ∨  b^{3, 41}_0 ∨ false 
c  in DIMACS:
-6512  6513  6514  0

c  3 does not represent an automaton state.
c    -(-b^{3, 41}_2 ∧  b^{3, 41}_1 ∧  b^{3, 41}_0 ∧ true) 
c  in CNF:
c     b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ false 
c  in DIMACS:
 6512 -6513 -6514  0
c  -3 does not represent an automaton state.
c    -( b^{3, 41}_2 ∧  b^{3, 41}_1 ∧  b^{3, 41}_0 ∧ true) 
c  in CNF:
c    -b^{3, 41}_2 ∨ -b^{3, 41}_1 ∨ -b^{3, 41}_0 ∨ false 
c  in DIMACS:
-6512 -6513 -6514  0

c i = 42
c  -2+1 --> -1
c    ( b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧  p_126) -> ( b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0)
c  in CNF:
c    -b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨  b^{3, 43}_2
c    -b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_1
c    -b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨  b^{3, 43}_0
c  in DIMACS:
-6515 -6516  6517 -126  6518 0
-6515 -6516  6517 -126 -6519 0
-6515 -6516  6517 -126  6520 0

c  -1+1 --> 0
c    ( b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0 ∧  p_126) -> (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧ -b^{3, 43}_0)
c  in CNF:
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_2
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_1
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_0
c  in DIMACS:
-6515  6516 -6517 -126 -6518 0
-6515  6516 -6517 -126 -6519 0
-6515  6516 -6517 -126 -6520 0

c  0+1 --> 1
c    (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧  p_126) -> (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0)
c  in CNF:
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_2
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_1
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨  b^{3, 43}_0
c  in DIMACS:
 6515  6516  6517 -126 -6518 0
 6515  6516  6517 -126 -6519 0
 6515  6516  6517 -126  6520 0

c  1+1 --> 2
c    (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0 ∧  p_126) -> (-b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0)
c  in CNF:
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_2
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨  b^{3, 43}_1
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ -p_126 ∨ -b^{3, 43}_0
c  in DIMACS:
 6515  6516 -6517 -126 -6518 0
 6515  6516 -6517 -126  6519 0
 6515  6516 -6517 -126 -6520 0

c  2+1 --> break 
c    (-b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧  p_126) -> break
c  in CNF:
c     b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 6515 -6516  6517 -126 1162 0


c  2-1 --> 1
c    (-b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧ -p_126) -> (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0)
c  in CNF:
c     b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_2
c     b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_1
c     b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨  b^{3, 43}_0
c  in DIMACS:
 6515 -6516  6517  126 -6518 0
 6515 -6516  6517  126 -6519 0
 6515 -6516  6517  126  6520 0

c  1-1 --> 0
c    (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0 ∧ -p_126) -> (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧ -b^{3, 43}_0)
c  in CNF:
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_2
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_1
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_0
c  in DIMACS:
 6515  6516 -6517  126 -6518 0
 6515  6516 -6517  126 -6519 0
 6515  6516 -6517  126 -6520 0

c  0-1 --> -1
c    (-b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧ -p_126) -> ( b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0)
c  in CNF:
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨  b^{3, 43}_2
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_1
c     b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨  b^{3, 43}_0
c  in DIMACS:
 6515  6516  6517  126  6518 0
 6515  6516  6517  126 -6519 0
 6515  6516  6517  126  6520 0

c  -1-1 --> -2
c    ( b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧  b^{3, 42}_0 ∧ -p_126) -> ( b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0)
c  in CNF:
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨  b^{3, 43}_2
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨  b^{3, 43}_1
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨  p_126 ∨ -b^{3, 43}_0
c  in DIMACS:
-6515  6516 -6517  126  6518 0
-6515  6516 -6517  126  6519 0
-6515  6516 -6517  126 -6520 0

c  -2-1 --> break 
c    ( b^{3, 42}_2 ∧  b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨  b^{3, 42}_0 ∨  p_126 ∨ break
c  in DIMACS:
-6515 -6516  6517  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 42}_2 ∧ -b^{3, 42}_1 ∧ -b^{3, 42}_0 ∧ true) 
c  in CNF:
c    -b^{3, 42}_2 ∨  b^{3, 42}_1 ∨  b^{3, 42}_0 ∨ false 
c  in DIMACS:
-6515  6516  6517  0

c  3 does not represent an automaton state.
c    -(-b^{3, 42}_2 ∧  b^{3, 42}_1 ∧  b^{3, 42}_0 ∧ true) 
c  in CNF:
c     b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ false 
c  in DIMACS:
 6515 -6516 -6517  0
c  -3 does not represent an automaton state.
c    -( b^{3, 42}_2 ∧  b^{3, 42}_1 ∧  b^{3, 42}_0 ∧ true) 
c  in CNF:
c    -b^{3, 42}_2 ∨ -b^{3, 42}_1 ∨ -b^{3, 42}_0 ∨ false 
c  in DIMACS:
-6515 -6516 -6517  0

c i = 43
c  -2+1 --> -1
c    ( b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧  p_129) -> ( b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0)
c  in CNF:
c    -b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨  b^{3, 44}_2
c    -b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_1
c    -b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨  b^{3, 44}_0
c  in DIMACS:
-6518 -6519  6520 -129  6521 0
-6518 -6519  6520 -129 -6522 0
-6518 -6519  6520 -129  6523 0

c  -1+1 --> 0
c    ( b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0 ∧  p_129) -> (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧ -b^{3, 44}_0)
c  in CNF:
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_2
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_1
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_0
c  in DIMACS:
-6518  6519 -6520 -129 -6521 0
-6518  6519 -6520 -129 -6522 0
-6518  6519 -6520 -129 -6523 0

c  0+1 --> 1
c    (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧  p_129) -> (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0)
c  in CNF:
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_2
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_1
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨  b^{3, 44}_0
c  in DIMACS:
 6518  6519  6520 -129 -6521 0
 6518  6519  6520 -129 -6522 0
 6518  6519  6520 -129  6523 0

c  1+1 --> 2
c    (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0 ∧  p_129) -> (-b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0)
c  in CNF:
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_2
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨  b^{3, 44}_1
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ -p_129 ∨ -b^{3, 44}_0
c  in DIMACS:
 6518  6519 -6520 -129 -6521 0
 6518  6519 -6520 -129  6522 0
 6518  6519 -6520 -129 -6523 0

c  2+1 --> break 
c    (-b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧  p_129) -> break
c  in CNF:
c     b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ -p_129 ∨ break
c  in DIMACS:
 6518 -6519  6520 -129 1162 0


c  2-1 --> 1
c    (-b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧ -p_129) -> (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0)
c  in CNF:
c     b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_2
c     b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_1
c     b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨  b^{3, 44}_0
c  in DIMACS:
 6518 -6519  6520  129 -6521 0
 6518 -6519  6520  129 -6522 0
 6518 -6519  6520  129  6523 0

c  1-1 --> 0
c    (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0 ∧ -p_129) -> (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧ -b^{3, 44}_0)
c  in CNF:
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_2
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_1
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_0
c  in DIMACS:
 6518  6519 -6520  129 -6521 0
 6518  6519 -6520  129 -6522 0
 6518  6519 -6520  129 -6523 0

c  0-1 --> -1
c    (-b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧ -p_129) -> ( b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0)
c  in CNF:
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨  b^{3, 44}_2
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_1
c     b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨  b^{3, 44}_0
c  in DIMACS:
 6518  6519  6520  129  6521 0
 6518  6519  6520  129 -6522 0
 6518  6519  6520  129  6523 0

c  -1-1 --> -2
c    ( b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧  b^{3, 43}_0 ∧ -p_129) -> ( b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0)
c  in CNF:
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨  b^{3, 44}_2
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨  b^{3, 44}_1
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨  p_129 ∨ -b^{3, 44}_0
c  in DIMACS:
-6518  6519 -6520  129  6521 0
-6518  6519 -6520  129  6522 0
-6518  6519 -6520  129 -6523 0

c  -2-1 --> break 
c    ( b^{3, 43}_2 ∧  b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧ -p_129) -> break
c  in CNF:
c    -b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨  b^{3, 43}_0 ∨  p_129 ∨ break
c  in DIMACS:
-6518 -6519  6520  129 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 43}_2 ∧ -b^{3, 43}_1 ∧ -b^{3, 43}_0 ∧ true) 
c  in CNF:
c    -b^{3, 43}_2 ∨  b^{3, 43}_1 ∨  b^{3, 43}_0 ∨ false 
c  in DIMACS:
-6518  6519  6520  0

c  3 does not represent an automaton state.
c    -(-b^{3, 43}_2 ∧  b^{3, 43}_1 ∧  b^{3, 43}_0 ∧ true) 
c  in CNF:
c     b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ false 
c  in DIMACS:
 6518 -6519 -6520  0
c  -3 does not represent an automaton state.
c    -( b^{3, 43}_2 ∧  b^{3, 43}_1 ∧  b^{3, 43}_0 ∧ true) 
c  in CNF:
c    -b^{3, 43}_2 ∨ -b^{3, 43}_1 ∨ -b^{3, 43}_0 ∨ false 
c  in DIMACS:
-6518 -6519 -6520  0

c i = 44
c  -2+1 --> -1
c    ( b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧  p_132) -> ( b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0)
c  in CNF:
c    -b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨  b^{3, 45}_2
c    -b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_1
c    -b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨  b^{3, 45}_0
c  in DIMACS:
-6521 -6522  6523 -132  6524 0
-6521 -6522  6523 -132 -6525 0
-6521 -6522  6523 -132  6526 0

c  -1+1 --> 0
c    ( b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0 ∧  p_132) -> (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧ -b^{3, 45}_0)
c  in CNF:
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_2
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_1
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_0
c  in DIMACS:
-6521  6522 -6523 -132 -6524 0
-6521  6522 -6523 -132 -6525 0
-6521  6522 -6523 -132 -6526 0

c  0+1 --> 1
c    (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧  p_132) -> (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0)
c  in CNF:
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_2
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_1
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨  b^{3, 45}_0
c  in DIMACS:
 6521  6522  6523 -132 -6524 0
 6521  6522  6523 -132 -6525 0
 6521  6522  6523 -132  6526 0

c  1+1 --> 2
c    (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0 ∧  p_132) -> (-b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0)
c  in CNF:
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_2
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨  b^{3, 45}_1
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ -p_132 ∨ -b^{3, 45}_0
c  in DIMACS:
 6521  6522 -6523 -132 -6524 0
 6521  6522 -6523 -132  6525 0
 6521  6522 -6523 -132 -6526 0

c  2+1 --> break 
c    (-b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧  p_132) -> break
c  in CNF:
c     b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 6521 -6522  6523 -132 1162 0


c  2-1 --> 1
c    (-b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧ -p_132) -> (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0)
c  in CNF:
c     b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_2
c     b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_1
c     b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨  b^{3, 45}_0
c  in DIMACS:
 6521 -6522  6523  132 -6524 0
 6521 -6522  6523  132 -6525 0
 6521 -6522  6523  132  6526 0

c  1-1 --> 0
c    (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0 ∧ -p_132) -> (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧ -b^{3, 45}_0)
c  in CNF:
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_2
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_1
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_0
c  in DIMACS:
 6521  6522 -6523  132 -6524 0
 6521  6522 -6523  132 -6525 0
 6521  6522 -6523  132 -6526 0

c  0-1 --> -1
c    (-b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧ -p_132) -> ( b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0)
c  in CNF:
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨  b^{3, 45}_2
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_1
c     b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨  b^{3, 45}_0
c  in DIMACS:
 6521  6522  6523  132  6524 0
 6521  6522  6523  132 -6525 0
 6521  6522  6523  132  6526 0

c  -1-1 --> -2
c    ( b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧  b^{3, 44}_0 ∧ -p_132) -> ( b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0)
c  in CNF:
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨  b^{3, 45}_2
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨  b^{3, 45}_1
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨  p_132 ∨ -b^{3, 45}_0
c  in DIMACS:
-6521  6522 -6523  132  6524 0
-6521  6522 -6523  132  6525 0
-6521  6522 -6523  132 -6526 0

c  -2-1 --> break 
c    ( b^{3, 44}_2 ∧  b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨  b^{3, 44}_0 ∨  p_132 ∨ break
c  in DIMACS:
-6521 -6522  6523  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 44}_2 ∧ -b^{3, 44}_1 ∧ -b^{3, 44}_0 ∧ true) 
c  in CNF:
c    -b^{3, 44}_2 ∨  b^{3, 44}_1 ∨  b^{3, 44}_0 ∨ false 
c  in DIMACS:
-6521  6522  6523  0

c  3 does not represent an automaton state.
c    -(-b^{3, 44}_2 ∧  b^{3, 44}_1 ∧  b^{3, 44}_0 ∧ true) 
c  in CNF:
c     b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ false 
c  in DIMACS:
 6521 -6522 -6523  0
c  -3 does not represent an automaton state.
c    -( b^{3, 44}_2 ∧  b^{3, 44}_1 ∧  b^{3, 44}_0 ∧ true) 
c  in CNF:
c    -b^{3, 44}_2 ∨ -b^{3, 44}_1 ∨ -b^{3, 44}_0 ∨ false 
c  in DIMACS:
-6521 -6522 -6523  0

c i = 45
c  -2+1 --> -1
c    ( b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧  p_135) -> ( b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0)
c  in CNF:
c    -b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨  b^{3, 46}_2
c    -b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_1
c    -b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨  b^{3, 46}_0
c  in DIMACS:
-6524 -6525  6526 -135  6527 0
-6524 -6525  6526 -135 -6528 0
-6524 -6525  6526 -135  6529 0

c  -1+1 --> 0
c    ( b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0 ∧  p_135) -> (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧ -b^{3, 46}_0)
c  in CNF:
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_2
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_1
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_0
c  in DIMACS:
-6524  6525 -6526 -135 -6527 0
-6524  6525 -6526 -135 -6528 0
-6524  6525 -6526 -135 -6529 0

c  0+1 --> 1
c    (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧  p_135) -> (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0)
c  in CNF:
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_2
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_1
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨  b^{3, 46}_0
c  in DIMACS:
 6524  6525  6526 -135 -6527 0
 6524  6525  6526 -135 -6528 0
 6524  6525  6526 -135  6529 0

c  1+1 --> 2
c    (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0 ∧  p_135) -> (-b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0)
c  in CNF:
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_2
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨  b^{3, 46}_1
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ -p_135 ∨ -b^{3, 46}_0
c  in DIMACS:
 6524  6525 -6526 -135 -6527 0
 6524  6525 -6526 -135  6528 0
 6524  6525 -6526 -135 -6529 0

c  2+1 --> break 
c    (-b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧  p_135) -> break
c  in CNF:
c     b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 6524 -6525  6526 -135 1162 0


c  2-1 --> 1
c    (-b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧ -p_135) -> (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0)
c  in CNF:
c     b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_2
c     b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_1
c     b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨  b^{3, 46}_0
c  in DIMACS:
 6524 -6525  6526  135 -6527 0
 6524 -6525  6526  135 -6528 0
 6524 -6525  6526  135  6529 0

c  1-1 --> 0
c    (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0 ∧ -p_135) -> (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧ -b^{3, 46}_0)
c  in CNF:
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_2
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_1
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_0
c  in DIMACS:
 6524  6525 -6526  135 -6527 0
 6524  6525 -6526  135 -6528 0
 6524  6525 -6526  135 -6529 0

c  0-1 --> -1
c    (-b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧ -p_135) -> ( b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0)
c  in CNF:
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨  b^{3, 46}_2
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_1
c     b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨  b^{3, 46}_0
c  in DIMACS:
 6524  6525  6526  135  6527 0
 6524  6525  6526  135 -6528 0
 6524  6525  6526  135  6529 0

c  -1-1 --> -2
c    ( b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧  b^{3, 45}_0 ∧ -p_135) -> ( b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0)
c  in CNF:
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨  b^{3, 46}_2
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨  b^{3, 46}_1
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨  p_135 ∨ -b^{3, 46}_0
c  in DIMACS:
-6524  6525 -6526  135  6527 0
-6524  6525 -6526  135  6528 0
-6524  6525 -6526  135 -6529 0

c  -2-1 --> break 
c    ( b^{3, 45}_2 ∧  b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨  b^{3, 45}_0 ∨  p_135 ∨ break
c  in DIMACS:
-6524 -6525  6526  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 45}_2 ∧ -b^{3, 45}_1 ∧ -b^{3, 45}_0 ∧ true) 
c  in CNF:
c    -b^{3, 45}_2 ∨  b^{3, 45}_1 ∨  b^{3, 45}_0 ∨ false 
c  in DIMACS:
-6524  6525  6526  0

c  3 does not represent an automaton state.
c    -(-b^{3, 45}_2 ∧  b^{3, 45}_1 ∧  b^{3, 45}_0 ∧ true) 
c  in CNF:
c     b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ false 
c  in DIMACS:
 6524 -6525 -6526  0
c  -3 does not represent an automaton state.
c    -( b^{3, 45}_2 ∧  b^{3, 45}_1 ∧  b^{3, 45}_0 ∧ true) 
c  in CNF:
c    -b^{3, 45}_2 ∨ -b^{3, 45}_1 ∨ -b^{3, 45}_0 ∨ false 
c  in DIMACS:
-6524 -6525 -6526  0

c i = 46
c  -2+1 --> -1
c    ( b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧  p_138) -> ( b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0)
c  in CNF:
c    -b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨  b^{3, 47}_2
c    -b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_1
c    -b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨  b^{3, 47}_0
c  in DIMACS:
-6527 -6528  6529 -138  6530 0
-6527 -6528  6529 -138 -6531 0
-6527 -6528  6529 -138  6532 0

c  -1+1 --> 0
c    ( b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0 ∧  p_138) -> (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧ -b^{3, 47}_0)
c  in CNF:
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_2
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_1
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_0
c  in DIMACS:
-6527  6528 -6529 -138 -6530 0
-6527  6528 -6529 -138 -6531 0
-6527  6528 -6529 -138 -6532 0

c  0+1 --> 1
c    (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧  p_138) -> (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0)
c  in CNF:
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_2
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_1
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨  b^{3, 47}_0
c  in DIMACS:
 6527  6528  6529 -138 -6530 0
 6527  6528  6529 -138 -6531 0
 6527  6528  6529 -138  6532 0

c  1+1 --> 2
c    (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0 ∧  p_138) -> (-b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0)
c  in CNF:
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_2
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨  b^{3, 47}_1
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ -p_138 ∨ -b^{3, 47}_0
c  in DIMACS:
 6527  6528 -6529 -138 -6530 0
 6527  6528 -6529 -138  6531 0
 6527  6528 -6529 -138 -6532 0

c  2+1 --> break 
c    (-b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧  p_138) -> break
c  in CNF:
c     b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 6527 -6528  6529 -138 1162 0


c  2-1 --> 1
c    (-b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧ -p_138) -> (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0)
c  in CNF:
c     b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_2
c     b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_1
c     b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨  b^{3, 47}_0
c  in DIMACS:
 6527 -6528  6529  138 -6530 0
 6527 -6528  6529  138 -6531 0
 6527 -6528  6529  138  6532 0

c  1-1 --> 0
c    (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0 ∧ -p_138) -> (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧ -b^{3, 47}_0)
c  in CNF:
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_2
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_1
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_0
c  in DIMACS:
 6527  6528 -6529  138 -6530 0
 6527  6528 -6529  138 -6531 0
 6527  6528 -6529  138 -6532 0

c  0-1 --> -1
c    (-b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧ -p_138) -> ( b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0)
c  in CNF:
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨  b^{3, 47}_2
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_1
c     b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨  b^{3, 47}_0
c  in DIMACS:
 6527  6528  6529  138  6530 0
 6527  6528  6529  138 -6531 0
 6527  6528  6529  138  6532 0

c  -1-1 --> -2
c    ( b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧  b^{3, 46}_0 ∧ -p_138) -> ( b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0)
c  in CNF:
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨  b^{3, 47}_2
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨  b^{3, 47}_1
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨  p_138 ∨ -b^{3, 47}_0
c  in DIMACS:
-6527  6528 -6529  138  6530 0
-6527  6528 -6529  138  6531 0
-6527  6528 -6529  138 -6532 0

c  -2-1 --> break 
c    ( b^{3, 46}_2 ∧  b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨  b^{3, 46}_0 ∨  p_138 ∨ break
c  in DIMACS:
-6527 -6528  6529  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 46}_2 ∧ -b^{3, 46}_1 ∧ -b^{3, 46}_0 ∧ true) 
c  in CNF:
c    -b^{3, 46}_2 ∨  b^{3, 46}_1 ∨  b^{3, 46}_0 ∨ false 
c  in DIMACS:
-6527  6528  6529  0

c  3 does not represent an automaton state.
c    -(-b^{3, 46}_2 ∧  b^{3, 46}_1 ∧  b^{3, 46}_0 ∧ true) 
c  in CNF:
c     b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ false 
c  in DIMACS:
 6527 -6528 -6529  0
c  -3 does not represent an automaton state.
c    -( b^{3, 46}_2 ∧  b^{3, 46}_1 ∧  b^{3, 46}_0 ∧ true) 
c  in CNF:
c    -b^{3, 46}_2 ∨ -b^{3, 46}_1 ∨ -b^{3, 46}_0 ∨ false 
c  in DIMACS:
-6527 -6528 -6529  0

c i = 47
c  -2+1 --> -1
c    ( b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧  p_141) -> ( b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0)
c  in CNF:
c    -b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨  b^{3, 48}_2
c    -b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_1
c    -b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨  b^{3, 48}_0
c  in DIMACS:
-6530 -6531  6532 -141  6533 0
-6530 -6531  6532 -141 -6534 0
-6530 -6531  6532 -141  6535 0

c  -1+1 --> 0
c    ( b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0 ∧  p_141) -> (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧ -b^{3, 48}_0)
c  in CNF:
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_2
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_1
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_0
c  in DIMACS:
-6530  6531 -6532 -141 -6533 0
-6530  6531 -6532 -141 -6534 0
-6530  6531 -6532 -141 -6535 0

c  0+1 --> 1
c    (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧  p_141) -> (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0)
c  in CNF:
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_2
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_1
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨  b^{3, 48}_0
c  in DIMACS:
 6530  6531  6532 -141 -6533 0
 6530  6531  6532 -141 -6534 0
 6530  6531  6532 -141  6535 0

c  1+1 --> 2
c    (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0 ∧  p_141) -> (-b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0)
c  in CNF:
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_2
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨  b^{3, 48}_1
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ -p_141 ∨ -b^{3, 48}_0
c  in DIMACS:
 6530  6531 -6532 -141 -6533 0
 6530  6531 -6532 -141  6534 0
 6530  6531 -6532 -141 -6535 0

c  2+1 --> break 
c    (-b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧  p_141) -> break
c  in CNF:
c     b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ -p_141 ∨ break
c  in DIMACS:
 6530 -6531  6532 -141 1162 0


c  2-1 --> 1
c    (-b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧ -p_141) -> (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0)
c  in CNF:
c     b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_2
c     b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_1
c     b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨  b^{3, 48}_0
c  in DIMACS:
 6530 -6531  6532  141 -6533 0
 6530 -6531  6532  141 -6534 0
 6530 -6531  6532  141  6535 0

c  1-1 --> 0
c    (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0 ∧ -p_141) -> (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧ -b^{3, 48}_0)
c  in CNF:
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_2
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_1
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_0
c  in DIMACS:
 6530  6531 -6532  141 -6533 0
 6530  6531 -6532  141 -6534 0
 6530  6531 -6532  141 -6535 0

c  0-1 --> -1
c    (-b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧ -p_141) -> ( b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0)
c  in CNF:
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨  b^{3, 48}_2
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_1
c     b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨  b^{3, 48}_0
c  in DIMACS:
 6530  6531  6532  141  6533 0
 6530  6531  6532  141 -6534 0
 6530  6531  6532  141  6535 0

c  -1-1 --> -2
c    ( b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧  b^{3, 47}_0 ∧ -p_141) -> ( b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0)
c  in CNF:
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨  b^{3, 48}_2
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨  b^{3, 48}_1
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨  p_141 ∨ -b^{3, 48}_0
c  in DIMACS:
-6530  6531 -6532  141  6533 0
-6530  6531 -6532  141  6534 0
-6530  6531 -6532  141 -6535 0

c  -2-1 --> break 
c    ( b^{3, 47}_2 ∧  b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧ -p_141) -> break
c  in CNF:
c    -b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨  b^{3, 47}_0 ∨  p_141 ∨ break
c  in DIMACS:
-6530 -6531  6532  141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 47}_2 ∧ -b^{3, 47}_1 ∧ -b^{3, 47}_0 ∧ true) 
c  in CNF:
c    -b^{3, 47}_2 ∨  b^{3, 47}_1 ∨  b^{3, 47}_0 ∨ false 
c  in DIMACS:
-6530  6531  6532  0

c  3 does not represent an automaton state.
c    -(-b^{3, 47}_2 ∧  b^{3, 47}_1 ∧  b^{3, 47}_0 ∧ true) 
c  in CNF:
c     b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ false 
c  in DIMACS:
 6530 -6531 -6532  0
c  -3 does not represent an automaton state.
c    -( b^{3, 47}_2 ∧  b^{3, 47}_1 ∧  b^{3, 47}_0 ∧ true) 
c  in CNF:
c    -b^{3, 47}_2 ∨ -b^{3, 47}_1 ∨ -b^{3, 47}_0 ∨ false 
c  in DIMACS:
-6530 -6531 -6532  0

c i = 48
c  -2+1 --> -1
c    ( b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧  p_144) -> ( b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0)
c  in CNF:
c    -b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨  b^{3, 49}_2
c    -b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_1
c    -b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨  b^{3, 49}_0
c  in DIMACS:
-6533 -6534  6535 -144  6536 0
-6533 -6534  6535 -144 -6537 0
-6533 -6534  6535 -144  6538 0

c  -1+1 --> 0
c    ( b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0 ∧  p_144) -> (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧ -b^{3, 49}_0)
c  in CNF:
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_2
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_1
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_0
c  in DIMACS:
-6533  6534 -6535 -144 -6536 0
-6533  6534 -6535 -144 -6537 0
-6533  6534 -6535 -144 -6538 0

c  0+1 --> 1
c    (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧  p_144) -> (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0)
c  in CNF:
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_2
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_1
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨  b^{3, 49}_0
c  in DIMACS:
 6533  6534  6535 -144 -6536 0
 6533  6534  6535 -144 -6537 0
 6533  6534  6535 -144  6538 0

c  1+1 --> 2
c    (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0 ∧  p_144) -> (-b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0)
c  in CNF:
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_2
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨  b^{3, 49}_1
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ -p_144 ∨ -b^{3, 49}_0
c  in DIMACS:
 6533  6534 -6535 -144 -6536 0
 6533  6534 -6535 -144  6537 0
 6533  6534 -6535 -144 -6538 0

c  2+1 --> break 
c    (-b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧  p_144) -> break
c  in CNF:
c     b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 6533 -6534  6535 -144 1162 0


c  2-1 --> 1
c    (-b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧ -p_144) -> (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0)
c  in CNF:
c     b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_2
c     b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_1
c     b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨  b^{3, 49}_0
c  in DIMACS:
 6533 -6534  6535  144 -6536 0
 6533 -6534  6535  144 -6537 0
 6533 -6534  6535  144  6538 0

c  1-1 --> 0
c    (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0 ∧ -p_144) -> (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧ -b^{3, 49}_0)
c  in CNF:
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_2
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_1
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_0
c  in DIMACS:
 6533  6534 -6535  144 -6536 0
 6533  6534 -6535  144 -6537 0
 6533  6534 -6535  144 -6538 0

c  0-1 --> -1
c    (-b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧ -p_144) -> ( b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0)
c  in CNF:
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨  b^{3, 49}_2
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_1
c     b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨  b^{3, 49}_0
c  in DIMACS:
 6533  6534  6535  144  6536 0
 6533  6534  6535  144 -6537 0
 6533  6534  6535  144  6538 0

c  -1-1 --> -2
c    ( b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧  b^{3, 48}_0 ∧ -p_144) -> ( b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0)
c  in CNF:
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨  b^{3, 49}_2
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨  b^{3, 49}_1
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨  p_144 ∨ -b^{3, 49}_0
c  in DIMACS:
-6533  6534 -6535  144  6536 0
-6533  6534 -6535  144  6537 0
-6533  6534 -6535  144 -6538 0

c  -2-1 --> break 
c    ( b^{3, 48}_2 ∧  b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨  b^{3, 48}_0 ∨  p_144 ∨ break
c  in DIMACS:
-6533 -6534  6535  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 48}_2 ∧ -b^{3, 48}_1 ∧ -b^{3, 48}_0 ∧ true) 
c  in CNF:
c    -b^{3, 48}_2 ∨  b^{3, 48}_1 ∨  b^{3, 48}_0 ∨ false 
c  in DIMACS:
-6533  6534  6535  0

c  3 does not represent an automaton state.
c    -(-b^{3, 48}_2 ∧  b^{3, 48}_1 ∧  b^{3, 48}_0 ∧ true) 
c  in CNF:
c     b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ false 
c  in DIMACS:
 6533 -6534 -6535  0
c  -3 does not represent an automaton state.
c    -( b^{3, 48}_2 ∧  b^{3, 48}_1 ∧  b^{3, 48}_0 ∧ true) 
c  in CNF:
c    -b^{3, 48}_2 ∨ -b^{3, 48}_1 ∨ -b^{3, 48}_0 ∨ false 
c  in DIMACS:
-6533 -6534 -6535  0

c i = 49
c  -2+1 --> -1
c    ( b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧  p_147) -> ( b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0)
c  in CNF:
c    -b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨  b^{3, 50}_2
c    -b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_1
c    -b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨  b^{3, 50}_0
c  in DIMACS:
-6536 -6537  6538 -147  6539 0
-6536 -6537  6538 -147 -6540 0
-6536 -6537  6538 -147  6541 0

c  -1+1 --> 0
c    ( b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0 ∧  p_147) -> (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧ -b^{3, 50}_0)
c  in CNF:
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_2
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_1
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_0
c  in DIMACS:
-6536  6537 -6538 -147 -6539 0
-6536  6537 -6538 -147 -6540 0
-6536  6537 -6538 -147 -6541 0

c  0+1 --> 1
c    (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧  p_147) -> (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0)
c  in CNF:
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_2
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_1
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨  b^{3, 50}_0
c  in DIMACS:
 6536  6537  6538 -147 -6539 0
 6536  6537  6538 -147 -6540 0
 6536  6537  6538 -147  6541 0

c  1+1 --> 2
c    (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0 ∧  p_147) -> (-b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0)
c  in CNF:
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_2
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨  b^{3, 50}_1
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ -p_147 ∨ -b^{3, 50}_0
c  in DIMACS:
 6536  6537 -6538 -147 -6539 0
 6536  6537 -6538 -147  6540 0
 6536  6537 -6538 -147 -6541 0

c  2+1 --> break 
c    (-b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧  p_147) -> break
c  in CNF:
c     b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 6536 -6537  6538 -147 1162 0


c  2-1 --> 1
c    (-b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧ -p_147) -> (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0)
c  in CNF:
c     b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_2
c     b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_1
c     b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨  b^{3, 50}_0
c  in DIMACS:
 6536 -6537  6538  147 -6539 0
 6536 -6537  6538  147 -6540 0
 6536 -6537  6538  147  6541 0

c  1-1 --> 0
c    (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0 ∧ -p_147) -> (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧ -b^{3, 50}_0)
c  in CNF:
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_2
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_1
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_0
c  in DIMACS:
 6536  6537 -6538  147 -6539 0
 6536  6537 -6538  147 -6540 0
 6536  6537 -6538  147 -6541 0

c  0-1 --> -1
c    (-b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧ -p_147) -> ( b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0)
c  in CNF:
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨  b^{3, 50}_2
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_1
c     b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨  b^{3, 50}_0
c  in DIMACS:
 6536  6537  6538  147  6539 0
 6536  6537  6538  147 -6540 0
 6536  6537  6538  147  6541 0

c  -1-1 --> -2
c    ( b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧  b^{3, 49}_0 ∧ -p_147) -> ( b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0)
c  in CNF:
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨  b^{3, 50}_2
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨  b^{3, 50}_1
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨  p_147 ∨ -b^{3, 50}_0
c  in DIMACS:
-6536  6537 -6538  147  6539 0
-6536  6537 -6538  147  6540 0
-6536  6537 -6538  147 -6541 0

c  -2-1 --> break 
c    ( b^{3, 49}_2 ∧  b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨  b^{3, 49}_0 ∨  p_147 ∨ break
c  in DIMACS:
-6536 -6537  6538  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 49}_2 ∧ -b^{3, 49}_1 ∧ -b^{3, 49}_0 ∧ true) 
c  in CNF:
c    -b^{3, 49}_2 ∨  b^{3, 49}_1 ∨  b^{3, 49}_0 ∨ false 
c  in DIMACS:
-6536  6537  6538  0

c  3 does not represent an automaton state.
c    -(-b^{3, 49}_2 ∧  b^{3, 49}_1 ∧  b^{3, 49}_0 ∧ true) 
c  in CNF:
c     b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ false 
c  in DIMACS:
 6536 -6537 -6538  0
c  -3 does not represent an automaton state.
c    -( b^{3, 49}_2 ∧  b^{3, 49}_1 ∧  b^{3, 49}_0 ∧ true) 
c  in CNF:
c    -b^{3, 49}_2 ∨ -b^{3, 49}_1 ∨ -b^{3, 49}_0 ∨ false 
c  in DIMACS:
-6536 -6537 -6538  0

c i = 50
c  -2+1 --> -1
c    ( b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧  p_150) -> ( b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0)
c  in CNF:
c    -b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨  b^{3, 51}_2
c    -b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_1
c    -b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨  b^{3, 51}_0
c  in DIMACS:
-6539 -6540  6541 -150  6542 0
-6539 -6540  6541 -150 -6543 0
-6539 -6540  6541 -150  6544 0

c  -1+1 --> 0
c    ( b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0 ∧  p_150) -> (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧ -b^{3, 51}_0)
c  in CNF:
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_2
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_1
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_0
c  in DIMACS:
-6539  6540 -6541 -150 -6542 0
-6539  6540 -6541 -150 -6543 0
-6539  6540 -6541 -150 -6544 0

c  0+1 --> 1
c    (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧  p_150) -> (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0)
c  in CNF:
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_2
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_1
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨  b^{3, 51}_0
c  in DIMACS:
 6539  6540  6541 -150 -6542 0
 6539  6540  6541 -150 -6543 0
 6539  6540  6541 -150  6544 0

c  1+1 --> 2
c    (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0 ∧  p_150) -> (-b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0)
c  in CNF:
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_2
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨  b^{3, 51}_1
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ -p_150 ∨ -b^{3, 51}_0
c  in DIMACS:
 6539  6540 -6541 -150 -6542 0
 6539  6540 -6541 -150  6543 0
 6539  6540 -6541 -150 -6544 0

c  2+1 --> break 
c    (-b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧  p_150) -> break
c  in CNF:
c     b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 6539 -6540  6541 -150 1162 0


c  2-1 --> 1
c    (-b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧ -p_150) -> (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0)
c  in CNF:
c     b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_2
c     b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_1
c     b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨  b^{3, 51}_0
c  in DIMACS:
 6539 -6540  6541  150 -6542 0
 6539 -6540  6541  150 -6543 0
 6539 -6540  6541  150  6544 0

c  1-1 --> 0
c    (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0 ∧ -p_150) -> (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧ -b^{3, 51}_0)
c  in CNF:
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_2
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_1
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_0
c  in DIMACS:
 6539  6540 -6541  150 -6542 0
 6539  6540 -6541  150 -6543 0
 6539  6540 -6541  150 -6544 0

c  0-1 --> -1
c    (-b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧ -p_150) -> ( b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0)
c  in CNF:
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨  b^{3, 51}_2
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_1
c     b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨  b^{3, 51}_0
c  in DIMACS:
 6539  6540  6541  150  6542 0
 6539  6540  6541  150 -6543 0
 6539  6540  6541  150  6544 0

c  -1-1 --> -2
c    ( b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧  b^{3, 50}_0 ∧ -p_150) -> ( b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0)
c  in CNF:
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨  b^{3, 51}_2
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨  b^{3, 51}_1
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨  p_150 ∨ -b^{3, 51}_0
c  in DIMACS:
-6539  6540 -6541  150  6542 0
-6539  6540 -6541  150  6543 0
-6539  6540 -6541  150 -6544 0

c  -2-1 --> break 
c    ( b^{3, 50}_2 ∧  b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨  b^{3, 50}_0 ∨  p_150 ∨ break
c  in DIMACS:
-6539 -6540  6541  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 50}_2 ∧ -b^{3, 50}_1 ∧ -b^{3, 50}_0 ∧ true) 
c  in CNF:
c    -b^{3, 50}_2 ∨  b^{3, 50}_1 ∨  b^{3, 50}_0 ∨ false 
c  in DIMACS:
-6539  6540  6541  0

c  3 does not represent an automaton state.
c    -(-b^{3, 50}_2 ∧  b^{3, 50}_1 ∧  b^{3, 50}_0 ∧ true) 
c  in CNF:
c     b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ false 
c  in DIMACS:
 6539 -6540 -6541  0
c  -3 does not represent an automaton state.
c    -( b^{3, 50}_2 ∧  b^{3, 50}_1 ∧  b^{3, 50}_0 ∧ true) 
c  in CNF:
c    -b^{3, 50}_2 ∨ -b^{3, 50}_1 ∨ -b^{3, 50}_0 ∨ false 
c  in DIMACS:
-6539 -6540 -6541  0

c i = 51
c  -2+1 --> -1
c    ( b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧  p_153) -> ( b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0)
c  in CNF:
c    -b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨  b^{3, 52}_2
c    -b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_1
c    -b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨  b^{3, 52}_0
c  in DIMACS:
-6542 -6543  6544 -153  6545 0
-6542 -6543  6544 -153 -6546 0
-6542 -6543  6544 -153  6547 0

c  -1+1 --> 0
c    ( b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0 ∧  p_153) -> (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧ -b^{3, 52}_0)
c  in CNF:
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_2
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_1
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_0
c  in DIMACS:
-6542  6543 -6544 -153 -6545 0
-6542  6543 -6544 -153 -6546 0
-6542  6543 -6544 -153 -6547 0

c  0+1 --> 1
c    (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧  p_153) -> (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0)
c  in CNF:
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_2
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_1
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨  b^{3, 52}_0
c  in DIMACS:
 6542  6543  6544 -153 -6545 0
 6542  6543  6544 -153 -6546 0
 6542  6543  6544 -153  6547 0

c  1+1 --> 2
c    (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0 ∧  p_153) -> (-b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0)
c  in CNF:
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_2
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨  b^{3, 52}_1
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ -p_153 ∨ -b^{3, 52}_0
c  in DIMACS:
 6542  6543 -6544 -153 -6545 0
 6542  6543 -6544 -153  6546 0
 6542  6543 -6544 -153 -6547 0

c  2+1 --> break 
c    (-b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧  p_153) -> break
c  in CNF:
c     b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 6542 -6543  6544 -153 1162 0


c  2-1 --> 1
c    (-b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧ -p_153) -> (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0)
c  in CNF:
c     b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_2
c     b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_1
c     b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨  b^{3, 52}_0
c  in DIMACS:
 6542 -6543  6544  153 -6545 0
 6542 -6543  6544  153 -6546 0
 6542 -6543  6544  153  6547 0

c  1-1 --> 0
c    (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0 ∧ -p_153) -> (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧ -b^{3, 52}_0)
c  in CNF:
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_2
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_1
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_0
c  in DIMACS:
 6542  6543 -6544  153 -6545 0
 6542  6543 -6544  153 -6546 0
 6542  6543 -6544  153 -6547 0

c  0-1 --> -1
c    (-b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧ -p_153) -> ( b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0)
c  in CNF:
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨  b^{3, 52}_2
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_1
c     b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨  b^{3, 52}_0
c  in DIMACS:
 6542  6543  6544  153  6545 0
 6542  6543  6544  153 -6546 0
 6542  6543  6544  153  6547 0

c  -1-1 --> -2
c    ( b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧  b^{3, 51}_0 ∧ -p_153) -> ( b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0)
c  in CNF:
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨  b^{3, 52}_2
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨  b^{3, 52}_1
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨  p_153 ∨ -b^{3, 52}_0
c  in DIMACS:
-6542  6543 -6544  153  6545 0
-6542  6543 -6544  153  6546 0
-6542  6543 -6544  153 -6547 0

c  -2-1 --> break 
c    ( b^{3, 51}_2 ∧  b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨  b^{3, 51}_0 ∨  p_153 ∨ break
c  in DIMACS:
-6542 -6543  6544  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 51}_2 ∧ -b^{3, 51}_1 ∧ -b^{3, 51}_0 ∧ true) 
c  in CNF:
c    -b^{3, 51}_2 ∨  b^{3, 51}_1 ∨  b^{3, 51}_0 ∨ false 
c  in DIMACS:
-6542  6543  6544  0

c  3 does not represent an automaton state.
c    -(-b^{3, 51}_2 ∧  b^{3, 51}_1 ∧  b^{3, 51}_0 ∧ true) 
c  in CNF:
c     b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ false 
c  in DIMACS:
 6542 -6543 -6544  0
c  -3 does not represent an automaton state.
c    -( b^{3, 51}_2 ∧  b^{3, 51}_1 ∧  b^{3, 51}_0 ∧ true) 
c  in CNF:
c    -b^{3, 51}_2 ∨ -b^{3, 51}_1 ∨ -b^{3, 51}_0 ∨ false 
c  in DIMACS:
-6542 -6543 -6544  0

c i = 52
c  -2+1 --> -1
c    ( b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧  p_156) -> ( b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0)
c  in CNF:
c    -b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨  b^{3, 53}_2
c    -b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_1
c    -b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨  b^{3, 53}_0
c  in DIMACS:
-6545 -6546  6547 -156  6548 0
-6545 -6546  6547 -156 -6549 0
-6545 -6546  6547 -156  6550 0

c  -1+1 --> 0
c    ( b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0 ∧  p_156) -> (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧ -b^{3, 53}_0)
c  in CNF:
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_2
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_1
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_0
c  in DIMACS:
-6545  6546 -6547 -156 -6548 0
-6545  6546 -6547 -156 -6549 0
-6545  6546 -6547 -156 -6550 0

c  0+1 --> 1
c    (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧  p_156) -> (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0)
c  in CNF:
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_2
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_1
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨  b^{3, 53}_0
c  in DIMACS:
 6545  6546  6547 -156 -6548 0
 6545  6546  6547 -156 -6549 0
 6545  6546  6547 -156  6550 0

c  1+1 --> 2
c    (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0 ∧  p_156) -> (-b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0)
c  in CNF:
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_2
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨  b^{3, 53}_1
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ -p_156 ∨ -b^{3, 53}_0
c  in DIMACS:
 6545  6546 -6547 -156 -6548 0
 6545  6546 -6547 -156  6549 0
 6545  6546 -6547 -156 -6550 0

c  2+1 --> break 
c    (-b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧  p_156) -> break
c  in CNF:
c     b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 6545 -6546  6547 -156 1162 0


c  2-1 --> 1
c    (-b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧ -p_156) -> (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0)
c  in CNF:
c     b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_2
c     b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_1
c     b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨  b^{3, 53}_0
c  in DIMACS:
 6545 -6546  6547  156 -6548 0
 6545 -6546  6547  156 -6549 0
 6545 -6546  6547  156  6550 0

c  1-1 --> 0
c    (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0 ∧ -p_156) -> (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧ -b^{3, 53}_0)
c  in CNF:
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_2
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_1
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_0
c  in DIMACS:
 6545  6546 -6547  156 -6548 0
 6545  6546 -6547  156 -6549 0
 6545  6546 -6547  156 -6550 0

c  0-1 --> -1
c    (-b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧ -p_156) -> ( b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0)
c  in CNF:
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨  b^{3, 53}_2
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_1
c     b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨  b^{3, 53}_0
c  in DIMACS:
 6545  6546  6547  156  6548 0
 6545  6546  6547  156 -6549 0
 6545  6546  6547  156  6550 0

c  -1-1 --> -2
c    ( b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧  b^{3, 52}_0 ∧ -p_156) -> ( b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0)
c  in CNF:
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨  b^{3, 53}_2
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨  b^{3, 53}_1
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨  p_156 ∨ -b^{3, 53}_0
c  in DIMACS:
-6545  6546 -6547  156  6548 0
-6545  6546 -6547  156  6549 0
-6545  6546 -6547  156 -6550 0

c  -2-1 --> break 
c    ( b^{3, 52}_2 ∧  b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨  b^{3, 52}_0 ∨  p_156 ∨ break
c  in DIMACS:
-6545 -6546  6547  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 52}_2 ∧ -b^{3, 52}_1 ∧ -b^{3, 52}_0 ∧ true) 
c  in CNF:
c    -b^{3, 52}_2 ∨  b^{3, 52}_1 ∨  b^{3, 52}_0 ∨ false 
c  in DIMACS:
-6545  6546  6547  0

c  3 does not represent an automaton state.
c    -(-b^{3, 52}_2 ∧  b^{3, 52}_1 ∧  b^{3, 52}_0 ∧ true) 
c  in CNF:
c     b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ false 
c  in DIMACS:
 6545 -6546 -6547  0
c  -3 does not represent an automaton state.
c    -( b^{3, 52}_2 ∧  b^{3, 52}_1 ∧  b^{3, 52}_0 ∧ true) 
c  in CNF:
c    -b^{3, 52}_2 ∨ -b^{3, 52}_1 ∨ -b^{3, 52}_0 ∨ false 
c  in DIMACS:
-6545 -6546 -6547  0

c i = 53
c  -2+1 --> -1
c    ( b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧  p_159) -> ( b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0)
c  in CNF:
c    -b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨  b^{3, 54}_2
c    -b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_1
c    -b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨  b^{3, 54}_0
c  in DIMACS:
-6548 -6549  6550 -159  6551 0
-6548 -6549  6550 -159 -6552 0
-6548 -6549  6550 -159  6553 0

c  -1+1 --> 0
c    ( b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0 ∧  p_159) -> (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧ -b^{3, 54}_0)
c  in CNF:
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_2
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_1
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_0
c  in DIMACS:
-6548  6549 -6550 -159 -6551 0
-6548  6549 -6550 -159 -6552 0
-6548  6549 -6550 -159 -6553 0

c  0+1 --> 1
c    (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧  p_159) -> (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0)
c  in CNF:
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_2
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_1
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨  b^{3, 54}_0
c  in DIMACS:
 6548  6549  6550 -159 -6551 0
 6548  6549  6550 -159 -6552 0
 6548  6549  6550 -159  6553 0

c  1+1 --> 2
c    (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0 ∧  p_159) -> (-b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0)
c  in CNF:
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_2
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨  b^{3, 54}_1
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ -p_159 ∨ -b^{3, 54}_0
c  in DIMACS:
 6548  6549 -6550 -159 -6551 0
 6548  6549 -6550 -159  6552 0
 6548  6549 -6550 -159 -6553 0

c  2+1 --> break 
c    (-b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧  p_159) -> break
c  in CNF:
c     b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ -p_159 ∨ break
c  in DIMACS:
 6548 -6549  6550 -159 1162 0


c  2-1 --> 1
c    (-b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧ -p_159) -> (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0)
c  in CNF:
c     b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_2
c     b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_1
c     b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨  b^{3, 54}_0
c  in DIMACS:
 6548 -6549  6550  159 -6551 0
 6548 -6549  6550  159 -6552 0
 6548 -6549  6550  159  6553 0

c  1-1 --> 0
c    (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0 ∧ -p_159) -> (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧ -b^{3, 54}_0)
c  in CNF:
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_2
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_1
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_0
c  in DIMACS:
 6548  6549 -6550  159 -6551 0
 6548  6549 -6550  159 -6552 0
 6548  6549 -6550  159 -6553 0

c  0-1 --> -1
c    (-b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧ -p_159) -> ( b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0)
c  in CNF:
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨  b^{3, 54}_2
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_1
c     b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨  b^{3, 54}_0
c  in DIMACS:
 6548  6549  6550  159  6551 0
 6548  6549  6550  159 -6552 0
 6548  6549  6550  159  6553 0

c  -1-1 --> -2
c    ( b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧  b^{3, 53}_0 ∧ -p_159) -> ( b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0)
c  in CNF:
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨  b^{3, 54}_2
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨  b^{3, 54}_1
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨  p_159 ∨ -b^{3, 54}_0
c  in DIMACS:
-6548  6549 -6550  159  6551 0
-6548  6549 -6550  159  6552 0
-6548  6549 -6550  159 -6553 0

c  -2-1 --> break 
c    ( b^{3, 53}_2 ∧  b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧ -p_159) -> break
c  in CNF:
c    -b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨  b^{3, 53}_0 ∨  p_159 ∨ break
c  in DIMACS:
-6548 -6549  6550  159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 53}_2 ∧ -b^{3, 53}_1 ∧ -b^{3, 53}_0 ∧ true) 
c  in CNF:
c    -b^{3, 53}_2 ∨  b^{3, 53}_1 ∨  b^{3, 53}_0 ∨ false 
c  in DIMACS:
-6548  6549  6550  0

c  3 does not represent an automaton state.
c    -(-b^{3, 53}_2 ∧  b^{3, 53}_1 ∧  b^{3, 53}_0 ∧ true) 
c  in CNF:
c     b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ false 
c  in DIMACS:
 6548 -6549 -6550  0
c  -3 does not represent an automaton state.
c    -( b^{3, 53}_2 ∧  b^{3, 53}_1 ∧  b^{3, 53}_0 ∧ true) 
c  in CNF:
c    -b^{3, 53}_2 ∨ -b^{3, 53}_1 ∨ -b^{3, 53}_0 ∨ false 
c  in DIMACS:
-6548 -6549 -6550  0

c i = 54
c  -2+1 --> -1
c    ( b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧  p_162) -> ( b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0)
c  in CNF:
c    -b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨  b^{3, 55}_2
c    -b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_1
c    -b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨  b^{3, 55}_0
c  in DIMACS:
-6551 -6552  6553 -162  6554 0
-6551 -6552  6553 -162 -6555 0
-6551 -6552  6553 -162  6556 0

c  -1+1 --> 0
c    ( b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0 ∧  p_162) -> (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧ -b^{3, 55}_0)
c  in CNF:
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_2
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_1
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_0
c  in DIMACS:
-6551  6552 -6553 -162 -6554 0
-6551  6552 -6553 -162 -6555 0
-6551  6552 -6553 -162 -6556 0

c  0+1 --> 1
c    (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧  p_162) -> (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0)
c  in CNF:
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_2
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_1
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨  b^{3, 55}_0
c  in DIMACS:
 6551  6552  6553 -162 -6554 0
 6551  6552  6553 -162 -6555 0
 6551  6552  6553 -162  6556 0

c  1+1 --> 2
c    (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0 ∧  p_162) -> (-b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0)
c  in CNF:
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_2
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨  b^{3, 55}_1
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ -p_162 ∨ -b^{3, 55}_0
c  in DIMACS:
 6551  6552 -6553 -162 -6554 0
 6551  6552 -6553 -162  6555 0
 6551  6552 -6553 -162 -6556 0

c  2+1 --> break 
c    (-b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧  p_162) -> break
c  in CNF:
c     b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 6551 -6552  6553 -162 1162 0


c  2-1 --> 1
c    (-b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧ -p_162) -> (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0)
c  in CNF:
c     b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_2
c     b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_1
c     b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨  b^{3, 55}_0
c  in DIMACS:
 6551 -6552  6553  162 -6554 0
 6551 -6552  6553  162 -6555 0
 6551 -6552  6553  162  6556 0

c  1-1 --> 0
c    (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0 ∧ -p_162) -> (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧ -b^{3, 55}_0)
c  in CNF:
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_2
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_1
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_0
c  in DIMACS:
 6551  6552 -6553  162 -6554 0
 6551  6552 -6553  162 -6555 0
 6551  6552 -6553  162 -6556 0

c  0-1 --> -1
c    (-b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧ -p_162) -> ( b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0)
c  in CNF:
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨  b^{3, 55}_2
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_1
c     b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨  b^{3, 55}_0
c  in DIMACS:
 6551  6552  6553  162  6554 0
 6551  6552  6553  162 -6555 0
 6551  6552  6553  162  6556 0

c  -1-1 --> -2
c    ( b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧  b^{3, 54}_0 ∧ -p_162) -> ( b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0)
c  in CNF:
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨  b^{3, 55}_2
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨  b^{3, 55}_1
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨  p_162 ∨ -b^{3, 55}_0
c  in DIMACS:
-6551  6552 -6553  162  6554 0
-6551  6552 -6553  162  6555 0
-6551  6552 -6553  162 -6556 0

c  -2-1 --> break 
c    ( b^{3, 54}_2 ∧  b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨  b^{3, 54}_0 ∨  p_162 ∨ break
c  in DIMACS:
-6551 -6552  6553  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 54}_2 ∧ -b^{3, 54}_1 ∧ -b^{3, 54}_0 ∧ true) 
c  in CNF:
c    -b^{3, 54}_2 ∨  b^{3, 54}_1 ∨  b^{3, 54}_0 ∨ false 
c  in DIMACS:
-6551  6552  6553  0

c  3 does not represent an automaton state.
c    -(-b^{3, 54}_2 ∧  b^{3, 54}_1 ∧  b^{3, 54}_0 ∧ true) 
c  in CNF:
c     b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ false 
c  in DIMACS:
 6551 -6552 -6553  0
c  -3 does not represent an automaton state.
c    -( b^{3, 54}_2 ∧  b^{3, 54}_1 ∧  b^{3, 54}_0 ∧ true) 
c  in CNF:
c    -b^{3, 54}_2 ∨ -b^{3, 54}_1 ∨ -b^{3, 54}_0 ∨ false 
c  in DIMACS:
-6551 -6552 -6553  0

c i = 55
c  -2+1 --> -1
c    ( b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧  p_165) -> ( b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0)
c  in CNF:
c    -b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨  b^{3, 56}_2
c    -b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_1
c    -b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨  b^{3, 56}_0
c  in DIMACS:
-6554 -6555  6556 -165  6557 0
-6554 -6555  6556 -165 -6558 0
-6554 -6555  6556 -165  6559 0

c  -1+1 --> 0
c    ( b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0 ∧  p_165) -> (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧ -b^{3, 56}_0)
c  in CNF:
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_2
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_1
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_0
c  in DIMACS:
-6554  6555 -6556 -165 -6557 0
-6554  6555 -6556 -165 -6558 0
-6554  6555 -6556 -165 -6559 0

c  0+1 --> 1
c    (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧  p_165) -> (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0)
c  in CNF:
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_2
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_1
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨  b^{3, 56}_0
c  in DIMACS:
 6554  6555  6556 -165 -6557 0
 6554  6555  6556 -165 -6558 0
 6554  6555  6556 -165  6559 0

c  1+1 --> 2
c    (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0 ∧  p_165) -> (-b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0)
c  in CNF:
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_2
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨  b^{3, 56}_1
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ -p_165 ∨ -b^{3, 56}_0
c  in DIMACS:
 6554  6555 -6556 -165 -6557 0
 6554  6555 -6556 -165  6558 0
 6554  6555 -6556 -165 -6559 0

c  2+1 --> break 
c    (-b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧  p_165) -> break
c  in CNF:
c     b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 6554 -6555  6556 -165 1162 0


c  2-1 --> 1
c    (-b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧ -p_165) -> (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0)
c  in CNF:
c     b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_2
c     b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_1
c     b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨  b^{3, 56}_0
c  in DIMACS:
 6554 -6555  6556  165 -6557 0
 6554 -6555  6556  165 -6558 0
 6554 -6555  6556  165  6559 0

c  1-1 --> 0
c    (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0 ∧ -p_165) -> (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧ -b^{3, 56}_0)
c  in CNF:
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_2
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_1
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_0
c  in DIMACS:
 6554  6555 -6556  165 -6557 0
 6554  6555 -6556  165 -6558 0
 6554  6555 -6556  165 -6559 0

c  0-1 --> -1
c    (-b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧ -p_165) -> ( b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0)
c  in CNF:
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨  b^{3, 56}_2
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_1
c     b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨  b^{3, 56}_0
c  in DIMACS:
 6554  6555  6556  165  6557 0
 6554  6555  6556  165 -6558 0
 6554  6555  6556  165  6559 0

c  -1-1 --> -2
c    ( b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧  b^{3, 55}_0 ∧ -p_165) -> ( b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0)
c  in CNF:
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨  b^{3, 56}_2
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨  b^{3, 56}_1
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨  p_165 ∨ -b^{3, 56}_0
c  in DIMACS:
-6554  6555 -6556  165  6557 0
-6554  6555 -6556  165  6558 0
-6554  6555 -6556  165 -6559 0

c  -2-1 --> break 
c    ( b^{3, 55}_2 ∧  b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨  b^{3, 55}_0 ∨  p_165 ∨ break
c  in DIMACS:
-6554 -6555  6556  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 55}_2 ∧ -b^{3, 55}_1 ∧ -b^{3, 55}_0 ∧ true) 
c  in CNF:
c    -b^{3, 55}_2 ∨  b^{3, 55}_1 ∨  b^{3, 55}_0 ∨ false 
c  in DIMACS:
-6554  6555  6556  0

c  3 does not represent an automaton state.
c    -(-b^{3, 55}_2 ∧  b^{3, 55}_1 ∧  b^{3, 55}_0 ∧ true) 
c  in CNF:
c     b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ false 
c  in DIMACS:
 6554 -6555 -6556  0
c  -3 does not represent an automaton state.
c    -( b^{3, 55}_2 ∧  b^{3, 55}_1 ∧  b^{3, 55}_0 ∧ true) 
c  in CNF:
c    -b^{3, 55}_2 ∨ -b^{3, 55}_1 ∨ -b^{3, 55}_0 ∨ false 
c  in DIMACS:
-6554 -6555 -6556  0

c i = 56
c  -2+1 --> -1
c    ( b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧  p_168) -> ( b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0)
c  in CNF:
c    -b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨  b^{3, 57}_2
c    -b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_1
c    -b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨  b^{3, 57}_0
c  in DIMACS:
-6557 -6558  6559 -168  6560 0
-6557 -6558  6559 -168 -6561 0
-6557 -6558  6559 -168  6562 0

c  -1+1 --> 0
c    ( b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0 ∧  p_168) -> (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧ -b^{3, 57}_0)
c  in CNF:
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_2
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_1
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_0
c  in DIMACS:
-6557  6558 -6559 -168 -6560 0
-6557  6558 -6559 -168 -6561 0
-6557  6558 -6559 -168 -6562 0

c  0+1 --> 1
c    (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧  p_168) -> (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0)
c  in CNF:
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_2
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_1
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨  b^{3, 57}_0
c  in DIMACS:
 6557  6558  6559 -168 -6560 0
 6557  6558  6559 -168 -6561 0
 6557  6558  6559 -168  6562 0

c  1+1 --> 2
c    (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0 ∧  p_168) -> (-b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0)
c  in CNF:
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_2
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨  b^{3, 57}_1
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ -p_168 ∨ -b^{3, 57}_0
c  in DIMACS:
 6557  6558 -6559 -168 -6560 0
 6557  6558 -6559 -168  6561 0
 6557  6558 -6559 -168 -6562 0

c  2+1 --> break 
c    (-b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧  p_168) -> break
c  in CNF:
c     b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 6557 -6558  6559 -168 1162 0


c  2-1 --> 1
c    (-b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧ -p_168) -> (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0)
c  in CNF:
c     b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_2
c     b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_1
c     b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨  b^{3, 57}_0
c  in DIMACS:
 6557 -6558  6559  168 -6560 0
 6557 -6558  6559  168 -6561 0
 6557 -6558  6559  168  6562 0

c  1-1 --> 0
c    (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0 ∧ -p_168) -> (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧ -b^{3, 57}_0)
c  in CNF:
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_2
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_1
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_0
c  in DIMACS:
 6557  6558 -6559  168 -6560 0
 6557  6558 -6559  168 -6561 0
 6557  6558 -6559  168 -6562 0

c  0-1 --> -1
c    (-b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧ -p_168) -> ( b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0)
c  in CNF:
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨  b^{3, 57}_2
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_1
c     b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨  b^{3, 57}_0
c  in DIMACS:
 6557  6558  6559  168  6560 0
 6557  6558  6559  168 -6561 0
 6557  6558  6559  168  6562 0

c  -1-1 --> -2
c    ( b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧  b^{3, 56}_0 ∧ -p_168) -> ( b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0)
c  in CNF:
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨  b^{3, 57}_2
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨  b^{3, 57}_1
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨  p_168 ∨ -b^{3, 57}_0
c  in DIMACS:
-6557  6558 -6559  168  6560 0
-6557  6558 -6559  168  6561 0
-6557  6558 -6559  168 -6562 0

c  -2-1 --> break 
c    ( b^{3, 56}_2 ∧  b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨  b^{3, 56}_0 ∨  p_168 ∨ break
c  in DIMACS:
-6557 -6558  6559  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 56}_2 ∧ -b^{3, 56}_1 ∧ -b^{3, 56}_0 ∧ true) 
c  in CNF:
c    -b^{3, 56}_2 ∨  b^{3, 56}_1 ∨  b^{3, 56}_0 ∨ false 
c  in DIMACS:
-6557  6558  6559  0

c  3 does not represent an automaton state.
c    -(-b^{3, 56}_2 ∧  b^{3, 56}_1 ∧  b^{3, 56}_0 ∧ true) 
c  in CNF:
c     b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ false 
c  in DIMACS:
 6557 -6558 -6559  0
c  -3 does not represent an automaton state.
c    -( b^{3, 56}_2 ∧  b^{3, 56}_1 ∧  b^{3, 56}_0 ∧ true) 
c  in CNF:
c    -b^{3, 56}_2 ∨ -b^{3, 56}_1 ∨ -b^{3, 56}_0 ∨ false 
c  in DIMACS:
-6557 -6558 -6559  0

c i = 57
c  -2+1 --> -1
c    ( b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧  p_171) -> ( b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0)
c  in CNF:
c    -b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨  b^{3, 58}_2
c    -b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_1
c    -b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨  b^{3, 58}_0
c  in DIMACS:
-6560 -6561  6562 -171  6563 0
-6560 -6561  6562 -171 -6564 0
-6560 -6561  6562 -171  6565 0

c  -1+1 --> 0
c    ( b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0 ∧  p_171) -> (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧ -b^{3, 58}_0)
c  in CNF:
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_2
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_1
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_0
c  in DIMACS:
-6560  6561 -6562 -171 -6563 0
-6560  6561 -6562 -171 -6564 0
-6560  6561 -6562 -171 -6565 0

c  0+1 --> 1
c    (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧  p_171) -> (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0)
c  in CNF:
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_2
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_1
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨  b^{3, 58}_0
c  in DIMACS:
 6560  6561  6562 -171 -6563 0
 6560  6561  6562 -171 -6564 0
 6560  6561  6562 -171  6565 0

c  1+1 --> 2
c    (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0 ∧  p_171) -> (-b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0)
c  in CNF:
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_2
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨  b^{3, 58}_1
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ -p_171 ∨ -b^{3, 58}_0
c  in DIMACS:
 6560  6561 -6562 -171 -6563 0
 6560  6561 -6562 -171  6564 0
 6560  6561 -6562 -171 -6565 0

c  2+1 --> break 
c    (-b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧  p_171) -> break
c  in CNF:
c     b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 6560 -6561  6562 -171 1162 0


c  2-1 --> 1
c    (-b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧ -p_171) -> (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0)
c  in CNF:
c     b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_2
c     b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_1
c     b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨  b^{3, 58}_0
c  in DIMACS:
 6560 -6561  6562  171 -6563 0
 6560 -6561  6562  171 -6564 0
 6560 -6561  6562  171  6565 0

c  1-1 --> 0
c    (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0 ∧ -p_171) -> (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧ -b^{3, 58}_0)
c  in CNF:
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_2
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_1
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_0
c  in DIMACS:
 6560  6561 -6562  171 -6563 0
 6560  6561 -6562  171 -6564 0
 6560  6561 -6562  171 -6565 0

c  0-1 --> -1
c    (-b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧ -p_171) -> ( b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0)
c  in CNF:
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨  b^{3, 58}_2
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_1
c     b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨  b^{3, 58}_0
c  in DIMACS:
 6560  6561  6562  171  6563 0
 6560  6561  6562  171 -6564 0
 6560  6561  6562  171  6565 0

c  -1-1 --> -2
c    ( b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧  b^{3, 57}_0 ∧ -p_171) -> ( b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0)
c  in CNF:
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨  b^{3, 58}_2
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨  b^{3, 58}_1
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨  p_171 ∨ -b^{3, 58}_0
c  in DIMACS:
-6560  6561 -6562  171  6563 0
-6560  6561 -6562  171  6564 0
-6560  6561 -6562  171 -6565 0

c  -2-1 --> break 
c    ( b^{3, 57}_2 ∧  b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨  b^{3, 57}_0 ∨  p_171 ∨ break
c  in DIMACS:
-6560 -6561  6562  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 57}_2 ∧ -b^{3, 57}_1 ∧ -b^{3, 57}_0 ∧ true) 
c  in CNF:
c    -b^{3, 57}_2 ∨  b^{3, 57}_1 ∨  b^{3, 57}_0 ∨ false 
c  in DIMACS:
-6560  6561  6562  0

c  3 does not represent an automaton state.
c    -(-b^{3, 57}_2 ∧  b^{3, 57}_1 ∧  b^{3, 57}_0 ∧ true) 
c  in CNF:
c     b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ false 
c  in DIMACS:
 6560 -6561 -6562  0
c  -3 does not represent an automaton state.
c    -( b^{3, 57}_2 ∧  b^{3, 57}_1 ∧  b^{3, 57}_0 ∧ true) 
c  in CNF:
c    -b^{3, 57}_2 ∨ -b^{3, 57}_1 ∨ -b^{3, 57}_0 ∨ false 
c  in DIMACS:
-6560 -6561 -6562  0

c i = 58
c  -2+1 --> -1
c    ( b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧  p_174) -> ( b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0)
c  in CNF:
c    -b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨  b^{3, 59}_2
c    -b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_1
c    -b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨  b^{3, 59}_0
c  in DIMACS:
-6563 -6564  6565 -174  6566 0
-6563 -6564  6565 -174 -6567 0
-6563 -6564  6565 -174  6568 0

c  -1+1 --> 0
c    ( b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0 ∧  p_174) -> (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧ -b^{3, 59}_0)
c  in CNF:
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_2
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_1
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_0
c  in DIMACS:
-6563  6564 -6565 -174 -6566 0
-6563  6564 -6565 -174 -6567 0
-6563  6564 -6565 -174 -6568 0

c  0+1 --> 1
c    (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧  p_174) -> (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0)
c  in CNF:
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_2
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_1
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨  b^{3, 59}_0
c  in DIMACS:
 6563  6564  6565 -174 -6566 0
 6563  6564  6565 -174 -6567 0
 6563  6564  6565 -174  6568 0

c  1+1 --> 2
c    (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0 ∧  p_174) -> (-b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0)
c  in CNF:
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_2
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨  b^{3, 59}_1
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ -p_174 ∨ -b^{3, 59}_0
c  in DIMACS:
 6563  6564 -6565 -174 -6566 0
 6563  6564 -6565 -174  6567 0
 6563  6564 -6565 -174 -6568 0

c  2+1 --> break 
c    (-b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧  p_174) -> break
c  in CNF:
c     b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 6563 -6564  6565 -174 1162 0


c  2-1 --> 1
c    (-b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧ -p_174) -> (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0)
c  in CNF:
c     b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_2
c     b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_1
c     b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨  b^{3, 59}_0
c  in DIMACS:
 6563 -6564  6565  174 -6566 0
 6563 -6564  6565  174 -6567 0
 6563 -6564  6565  174  6568 0

c  1-1 --> 0
c    (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0 ∧ -p_174) -> (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧ -b^{3, 59}_0)
c  in CNF:
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_2
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_1
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_0
c  in DIMACS:
 6563  6564 -6565  174 -6566 0
 6563  6564 -6565  174 -6567 0
 6563  6564 -6565  174 -6568 0

c  0-1 --> -1
c    (-b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧ -p_174) -> ( b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0)
c  in CNF:
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨  b^{3, 59}_2
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_1
c     b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨  b^{3, 59}_0
c  in DIMACS:
 6563  6564  6565  174  6566 0
 6563  6564  6565  174 -6567 0
 6563  6564  6565  174  6568 0

c  -1-1 --> -2
c    ( b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧  b^{3, 58}_0 ∧ -p_174) -> ( b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0)
c  in CNF:
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨  b^{3, 59}_2
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨  b^{3, 59}_1
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨  p_174 ∨ -b^{3, 59}_0
c  in DIMACS:
-6563  6564 -6565  174  6566 0
-6563  6564 -6565  174  6567 0
-6563  6564 -6565  174 -6568 0

c  -2-1 --> break 
c    ( b^{3, 58}_2 ∧  b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨  b^{3, 58}_0 ∨  p_174 ∨ break
c  in DIMACS:
-6563 -6564  6565  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 58}_2 ∧ -b^{3, 58}_1 ∧ -b^{3, 58}_0 ∧ true) 
c  in CNF:
c    -b^{3, 58}_2 ∨  b^{3, 58}_1 ∨  b^{3, 58}_0 ∨ false 
c  in DIMACS:
-6563  6564  6565  0

c  3 does not represent an automaton state.
c    -(-b^{3, 58}_2 ∧  b^{3, 58}_1 ∧  b^{3, 58}_0 ∧ true) 
c  in CNF:
c     b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ false 
c  in DIMACS:
 6563 -6564 -6565  0
c  -3 does not represent an automaton state.
c    -( b^{3, 58}_2 ∧  b^{3, 58}_1 ∧  b^{3, 58}_0 ∧ true) 
c  in CNF:
c    -b^{3, 58}_2 ∨ -b^{3, 58}_1 ∨ -b^{3, 58}_0 ∨ false 
c  in DIMACS:
-6563 -6564 -6565  0

c i = 59
c  -2+1 --> -1
c    ( b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧  p_177) -> ( b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0)
c  in CNF:
c    -b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨  b^{3, 60}_2
c    -b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_1
c    -b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨  b^{3, 60}_0
c  in DIMACS:
-6566 -6567  6568 -177  6569 0
-6566 -6567  6568 -177 -6570 0
-6566 -6567  6568 -177  6571 0

c  -1+1 --> 0
c    ( b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0 ∧  p_177) -> (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧ -b^{3, 60}_0)
c  in CNF:
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_2
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_1
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_0
c  in DIMACS:
-6566  6567 -6568 -177 -6569 0
-6566  6567 -6568 -177 -6570 0
-6566  6567 -6568 -177 -6571 0

c  0+1 --> 1
c    (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧  p_177) -> (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0)
c  in CNF:
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_2
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_1
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨  b^{3, 60}_0
c  in DIMACS:
 6566  6567  6568 -177 -6569 0
 6566  6567  6568 -177 -6570 0
 6566  6567  6568 -177  6571 0

c  1+1 --> 2
c    (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0 ∧  p_177) -> (-b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0)
c  in CNF:
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_2
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨  b^{3, 60}_1
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ -p_177 ∨ -b^{3, 60}_0
c  in DIMACS:
 6566  6567 -6568 -177 -6569 0
 6566  6567 -6568 -177  6570 0
 6566  6567 -6568 -177 -6571 0

c  2+1 --> break 
c    (-b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧  p_177) -> break
c  in CNF:
c     b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ -p_177 ∨ break
c  in DIMACS:
 6566 -6567  6568 -177 1162 0


c  2-1 --> 1
c    (-b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧ -p_177) -> (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0)
c  in CNF:
c     b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_2
c     b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_1
c     b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨  b^{3, 60}_0
c  in DIMACS:
 6566 -6567  6568  177 -6569 0
 6566 -6567  6568  177 -6570 0
 6566 -6567  6568  177  6571 0

c  1-1 --> 0
c    (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0 ∧ -p_177) -> (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧ -b^{3, 60}_0)
c  in CNF:
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_2
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_1
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_0
c  in DIMACS:
 6566  6567 -6568  177 -6569 0
 6566  6567 -6568  177 -6570 0
 6566  6567 -6568  177 -6571 0

c  0-1 --> -1
c    (-b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧ -p_177) -> ( b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0)
c  in CNF:
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨  b^{3, 60}_2
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_1
c     b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨  b^{3, 60}_0
c  in DIMACS:
 6566  6567  6568  177  6569 0
 6566  6567  6568  177 -6570 0
 6566  6567  6568  177  6571 0

c  -1-1 --> -2
c    ( b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧  b^{3, 59}_0 ∧ -p_177) -> ( b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0)
c  in CNF:
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨  b^{3, 60}_2
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨  b^{3, 60}_1
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨  p_177 ∨ -b^{3, 60}_0
c  in DIMACS:
-6566  6567 -6568  177  6569 0
-6566  6567 -6568  177  6570 0
-6566  6567 -6568  177 -6571 0

c  -2-1 --> break 
c    ( b^{3, 59}_2 ∧  b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧ -p_177) -> break
c  in CNF:
c    -b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨  b^{3, 59}_0 ∨  p_177 ∨ break
c  in DIMACS:
-6566 -6567  6568  177 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 59}_2 ∧ -b^{3, 59}_1 ∧ -b^{3, 59}_0 ∧ true) 
c  in CNF:
c    -b^{3, 59}_2 ∨  b^{3, 59}_1 ∨  b^{3, 59}_0 ∨ false 
c  in DIMACS:
-6566  6567  6568  0

c  3 does not represent an automaton state.
c    -(-b^{3, 59}_2 ∧  b^{3, 59}_1 ∧  b^{3, 59}_0 ∧ true) 
c  in CNF:
c     b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ false 
c  in DIMACS:
 6566 -6567 -6568  0
c  -3 does not represent an automaton state.
c    -( b^{3, 59}_2 ∧  b^{3, 59}_1 ∧  b^{3, 59}_0 ∧ true) 
c  in CNF:
c    -b^{3, 59}_2 ∨ -b^{3, 59}_1 ∨ -b^{3, 59}_0 ∨ false 
c  in DIMACS:
-6566 -6567 -6568  0

c i = 60
c  -2+1 --> -1
c    ( b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧  p_180) -> ( b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0)
c  in CNF:
c    -b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨  b^{3, 61}_2
c    -b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_1
c    -b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨  b^{3, 61}_0
c  in DIMACS:
-6569 -6570  6571 -180  6572 0
-6569 -6570  6571 -180 -6573 0
-6569 -6570  6571 -180  6574 0

c  -1+1 --> 0
c    ( b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0 ∧  p_180) -> (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧ -b^{3, 61}_0)
c  in CNF:
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_2
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_1
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_0
c  in DIMACS:
-6569  6570 -6571 -180 -6572 0
-6569  6570 -6571 -180 -6573 0
-6569  6570 -6571 -180 -6574 0

c  0+1 --> 1
c    (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧  p_180) -> (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0)
c  in CNF:
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_2
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_1
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨  b^{3, 61}_0
c  in DIMACS:
 6569  6570  6571 -180 -6572 0
 6569  6570  6571 -180 -6573 0
 6569  6570  6571 -180  6574 0

c  1+1 --> 2
c    (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0 ∧  p_180) -> (-b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0)
c  in CNF:
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_2
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨  b^{3, 61}_1
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ -p_180 ∨ -b^{3, 61}_0
c  in DIMACS:
 6569  6570 -6571 -180 -6572 0
 6569  6570 -6571 -180  6573 0
 6569  6570 -6571 -180 -6574 0

c  2+1 --> break 
c    (-b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧  p_180) -> break
c  in CNF:
c     b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 6569 -6570  6571 -180 1162 0


c  2-1 --> 1
c    (-b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧ -p_180) -> (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0)
c  in CNF:
c     b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_2
c     b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_1
c     b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨  b^{3, 61}_0
c  in DIMACS:
 6569 -6570  6571  180 -6572 0
 6569 -6570  6571  180 -6573 0
 6569 -6570  6571  180  6574 0

c  1-1 --> 0
c    (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0 ∧ -p_180) -> (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧ -b^{3, 61}_0)
c  in CNF:
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_2
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_1
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_0
c  in DIMACS:
 6569  6570 -6571  180 -6572 0
 6569  6570 -6571  180 -6573 0
 6569  6570 -6571  180 -6574 0

c  0-1 --> -1
c    (-b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧ -p_180) -> ( b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0)
c  in CNF:
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨  b^{3, 61}_2
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_1
c     b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨  b^{3, 61}_0
c  in DIMACS:
 6569  6570  6571  180  6572 0
 6569  6570  6571  180 -6573 0
 6569  6570  6571  180  6574 0

c  -1-1 --> -2
c    ( b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧  b^{3, 60}_0 ∧ -p_180) -> ( b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0)
c  in CNF:
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨  b^{3, 61}_2
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨  b^{3, 61}_1
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨  p_180 ∨ -b^{3, 61}_0
c  in DIMACS:
-6569  6570 -6571  180  6572 0
-6569  6570 -6571  180  6573 0
-6569  6570 -6571  180 -6574 0

c  -2-1 --> break 
c    ( b^{3, 60}_2 ∧  b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨  b^{3, 60}_0 ∨  p_180 ∨ break
c  in DIMACS:
-6569 -6570  6571  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 60}_2 ∧ -b^{3, 60}_1 ∧ -b^{3, 60}_0 ∧ true) 
c  in CNF:
c    -b^{3, 60}_2 ∨  b^{3, 60}_1 ∨  b^{3, 60}_0 ∨ false 
c  in DIMACS:
-6569  6570  6571  0

c  3 does not represent an automaton state.
c    -(-b^{3, 60}_2 ∧  b^{3, 60}_1 ∧  b^{3, 60}_0 ∧ true) 
c  in CNF:
c     b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ false 
c  in DIMACS:
 6569 -6570 -6571  0
c  -3 does not represent an automaton state.
c    -( b^{3, 60}_2 ∧  b^{3, 60}_1 ∧  b^{3, 60}_0 ∧ true) 
c  in CNF:
c    -b^{3, 60}_2 ∨ -b^{3, 60}_1 ∨ -b^{3, 60}_0 ∨ false 
c  in DIMACS:
-6569 -6570 -6571  0

c i = 61
c  -2+1 --> -1
c    ( b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧  p_183) -> ( b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0)
c  in CNF:
c    -b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨  b^{3, 62}_2
c    -b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_1
c    -b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨  b^{3, 62}_0
c  in DIMACS:
-6572 -6573  6574 -183  6575 0
-6572 -6573  6574 -183 -6576 0
-6572 -6573  6574 -183  6577 0

c  -1+1 --> 0
c    ( b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0 ∧  p_183) -> (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧ -b^{3, 62}_0)
c  in CNF:
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_2
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_1
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_0
c  in DIMACS:
-6572  6573 -6574 -183 -6575 0
-6572  6573 -6574 -183 -6576 0
-6572  6573 -6574 -183 -6577 0

c  0+1 --> 1
c    (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧  p_183) -> (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0)
c  in CNF:
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_2
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_1
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨  b^{3, 62}_0
c  in DIMACS:
 6572  6573  6574 -183 -6575 0
 6572  6573  6574 -183 -6576 0
 6572  6573  6574 -183  6577 0

c  1+1 --> 2
c    (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0 ∧  p_183) -> (-b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0)
c  in CNF:
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_2
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨  b^{3, 62}_1
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ -p_183 ∨ -b^{3, 62}_0
c  in DIMACS:
 6572  6573 -6574 -183 -6575 0
 6572  6573 -6574 -183  6576 0
 6572  6573 -6574 -183 -6577 0

c  2+1 --> break 
c    (-b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧  p_183) -> break
c  in CNF:
c     b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ -p_183 ∨ break
c  in DIMACS:
 6572 -6573  6574 -183 1162 0


c  2-1 --> 1
c    (-b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧ -p_183) -> (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0)
c  in CNF:
c     b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_2
c     b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_1
c     b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨  b^{3, 62}_0
c  in DIMACS:
 6572 -6573  6574  183 -6575 0
 6572 -6573  6574  183 -6576 0
 6572 -6573  6574  183  6577 0

c  1-1 --> 0
c    (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0 ∧ -p_183) -> (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧ -b^{3, 62}_0)
c  in CNF:
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_2
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_1
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_0
c  in DIMACS:
 6572  6573 -6574  183 -6575 0
 6572  6573 -6574  183 -6576 0
 6572  6573 -6574  183 -6577 0

c  0-1 --> -1
c    (-b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧ -p_183) -> ( b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0)
c  in CNF:
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨  b^{3, 62}_2
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_1
c     b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨  b^{3, 62}_0
c  in DIMACS:
 6572  6573  6574  183  6575 0
 6572  6573  6574  183 -6576 0
 6572  6573  6574  183  6577 0

c  -1-1 --> -2
c    ( b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧  b^{3, 61}_0 ∧ -p_183) -> ( b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0)
c  in CNF:
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨  b^{3, 62}_2
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨  b^{3, 62}_1
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨  p_183 ∨ -b^{3, 62}_0
c  in DIMACS:
-6572  6573 -6574  183  6575 0
-6572  6573 -6574  183  6576 0
-6572  6573 -6574  183 -6577 0

c  -2-1 --> break 
c    ( b^{3, 61}_2 ∧  b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧ -p_183) -> break
c  in CNF:
c    -b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨  b^{3, 61}_0 ∨  p_183 ∨ break
c  in DIMACS:
-6572 -6573  6574  183 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 61}_2 ∧ -b^{3, 61}_1 ∧ -b^{3, 61}_0 ∧ true) 
c  in CNF:
c    -b^{3, 61}_2 ∨  b^{3, 61}_1 ∨  b^{3, 61}_0 ∨ false 
c  in DIMACS:
-6572  6573  6574  0

c  3 does not represent an automaton state.
c    -(-b^{3, 61}_2 ∧  b^{3, 61}_1 ∧  b^{3, 61}_0 ∧ true) 
c  in CNF:
c     b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ false 
c  in DIMACS:
 6572 -6573 -6574  0
c  -3 does not represent an automaton state.
c    -( b^{3, 61}_2 ∧  b^{3, 61}_1 ∧  b^{3, 61}_0 ∧ true) 
c  in CNF:
c    -b^{3, 61}_2 ∨ -b^{3, 61}_1 ∨ -b^{3, 61}_0 ∨ false 
c  in DIMACS:
-6572 -6573 -6574  0

c i = 62
c  -2+1 --> -1
c    ( b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧  p_186) -> ( b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0)
c  in CNF:
c    -b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨  b^{3, 63}_2
c    -b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_1
c    -b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨  b^{3, 63}_0
c  in DIMACS:
-6575 -6576  6577 -186  6578 0
-6575 -6576  6577 -186 -6579 0
-6575 -6576  6577 -186  6580 0

c  -1+1 --> 0
c    ( b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0 ∧  p_186) -> (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧ -b^{3, 63}_0)
c  in CNF:
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_2
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_1
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_0
c  in DIMACS:
-6575  6576 -6577 -186 -6578 0
-6575  6576 -6577 -186 -6579 0
-6575  6576 -6577 -186 -6580 0

c  0+1 --> 1
c    (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧  p_186) -> (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0)
c  in CNF:
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_2
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_1
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨  b^{3, 63}_0
c  in DIMACS:
 6575  6576  6577 -186 -6578 0
 6575  6576  6577 -186 -6579 0
 6575  6576  6577 -186  6580 0

c  1+1 --> 2
c    (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0 ∧  p_186) -> (-b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0)
c  in CNF:
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_2
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨  b^{3, 63}_1
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ -p_186 ∨ -b^{3, 63}_0
c  in DIMACS:
 6575  6576 -6577 -186 -6578 0
 6575  6576 -6577 -186  6579 0
 6575  6576 -6577 -186 -6580 0

c  2+1 --> break 
c    (-b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧  p_186) -> break
c  in CNF:
c     b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 6575 -6576  6577 -186 1162 0


c  2-1 --> 1
c    (-b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧ -p_186) -> (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0)
c  in CNF:
c     b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_2
c     b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_1
c     b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨  b^{3, 63}_0
c  in DIMACS:
 6575 -6576  6577  186 -6578 0
 6575 -6576  6577  186 -6579 0
 6575 -6576  6577  186  6580 0

c  1-1 --> 0
c    (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0 ∧ -p_186) -> (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧ -b^{3, 63}_0)
c  in CNF:
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_2
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_1
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_0
c  in DIMACS:
 6575  6576 -6577  186 -6578 0
 6575  6576 -6577  186 -6579 0
 6575  6576 -6577  186 -6580 0

c  0-1 --> -1
c    (-b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧ -p_186) -> ( b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0)
c  in CNF:
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨  b^{3, 63}_2
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_1
c     b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨  b^{3, 63}_0
c  in DIMACS:
 6575  6576  6577  186  6578 0
 6575  6576  6577  186 -6579 0
 6575  6576  6577  186  6580 0

c  -1-1 --> -2
c    ( b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧  b^{3, 62}_0 ∧ -p_186) -> ( b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0)
c  in CNF:
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨  b^{3, 63}_2
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨  b^{3, 63}_1
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨  p_186 ∨ -b^{3, 63}_0
c  in DIMACS:
-6575  6576 -6577  186  6578 0
-6575  6576 -6577  186  6579 0
-6575  6576 -6577  186 -6580 0

c  -2-1 --> break 
c    ( b^{3, 62}_2 ∧  b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨  b^{3, 62}_0 ∨  p_186 ∨ break
c  in DIMACS:
-6575 -6576  6577  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 62}_2 ∧ -b^{3, 62}_1 ∧ -b^{3, 62}_0 ∧ true) 
c  in CNF:
c    -b^{3, 62}_2 ∨  b^{3, 62}_1 ∨  b^{3, 62}_0 ∨ false 
c  in DIMACS:
-6575  6576  6577  0

c  3 does not represent an automaton state.
c    -(-b^{3, 62}_2 ∧  b^{3, 62}_1 ∧  b^{3, 62}_0 ∧ true) 
c  in CNF:
c     b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ false 
c  in DIMACS:
 6575 -6576 -6577  0
c  -3 does not represent an automaton state.
c    -( b^{3, 62}_2 ∧  b^{3, 62}_1 ∧  b^{3, 62}_0 ∧ true) 
c  in CNF:
c    -b^{3, 62}_2 ∨ -b^{3, 62}_1 ∨ -b^{3, 62}_0 ∨ false 
c  in DIMACS:
-6575 -6576 -6577  0

c i = 63
c  -2+1 --> -1
c    ( b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧  p_189) -> ( b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0)
c  in CNF:
c    -b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨  b^{3, 64}_2
c    -b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_1
c    -b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨  b^{3, 64}_0
c  in DIMACS:
-6578 -6579  6580 -189  6581 0
-6578 -6579  6580 -189 -6582 0
-6578 -6579  6580 -189  6583 0

c  -1+1 --> 0
c    ( b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0 ∧  p_189) -> (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧ -b^{3, 64}_0)
c  in CNF:
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_2
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_1
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_0
c  in DIMACS:
-6578  6579 -6580 -189 -6581 0
-6578  6579 -6580 -189 -6582 0
-6578  6579 -6580 -189 -6583 0

c  0+1 --> 1
c    (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧  p_189) -> (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0)
c  in CNF:
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_2
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_1
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨  b^{3, 64}_0
c  in DIMACS:
 6578  6579  6580 -189 -6581 0
 6578  6579  6580 -189 -6582 0
 6578  6579  6580 -189  6583 0

c  1+1 --> 2
c    (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0 ∧  p_189) -> (-b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0)
c  in CNF:
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_2
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨  b^{3, 64}_1
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ -p_189 ∨ -b^{3, 64}_0
c  in DIMACS:
 6578  6579 -6580 -189 -6581 0
 6578  6579 -6580 -189  6582 0
 6578  6579 -6580 -189 -6583 0

c  2+1 --> break 
c    (-b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧  p_189) -> break
c  in CNF:
c     b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 6578 -6579  6580 -189 1162 0


c  2-1 --> 1
c    (-b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧ -p_189) -> (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0)
c  in CNF:
c     b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_2
c     b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_1
c     b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨  b^{3, 64}_0
c  in DIMACS:
 6578 -6579  6580  189 -6581 0
 6578 -6579  6580  189 -6582 0
 6578 -6579  6580  189  6583 0

c  1-1 --> 0
c    (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0 ∧ -p_189) -> (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧ -b^{3, 64}_0)
c  in CNF:
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_2
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_1
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_0
c  in DIMACS:
 6578  6579 -6580  189 -6581 0
 6578  6579 -6580  189 -6582 0
 6578  6579 -6580  189 -6583 0

c  0-1 --> -1
c    (-b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧ -p_189) -> ( b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0)
c  in CNF:
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨  b^{3, 64}_2
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_1
c     b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨  b^{3, 64}_0
c  in DIMACS:
 6578  6579  6580  189  6581 0
 6578  6579  6580  189 -6582 0
 6578  6579  6580  189  6583 0

c  -1-1 --> -2
c    ( b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧  b^{3, 63}_0 ∧ -p_189) -> ( b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0)
c  in CNF:
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨  b^{3, 64}_2
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨  b^{3, 64}_1
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨  p_189 ∨ -b^{3, 64}_0
c  in DIMACS:
-6578  6579 -6580  189  6581 0
-6578  6579 -6580  189  6582 0
-6578  6579 -6580  189 -6583 0

c  -2-1 --> break 
c    ( b^{3, 63}_2 ∧  b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨  b^{3, 63}_0 ∨  p_189 ∨ break
c  in DIMACS:
-6578 -6579  6580  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 63}_2 ∧ -b^{3, 63}_1 ∧ -b^{3, 63}_0 ∧ true) 
c  in CNF:
c    -b^{3, 63}_2 ∨  b^{3, 63}_1 ∨  b^{3, 63}_0 ∨ false 
c  in DIMACS:
-6578  6579  6580  0

c  3 does not represent an automaton state.
c    -(-b^{3, 63}_2 ∧  b^{3, 63}_1 ∧  b^{3, 63}_0 ∧ true) 
c  in CNF:
c     b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ false 
c  in DIMACS:
 6578 -6579 -6580  0
c  -3 does not represent an automaton state.
c    -( b^{3, 63}_2 ∧  b^{3, 63}_1 ∧  b^{3, 63}_0 ∧ true) 
c  in CNF:
c    -b^{3, 63}_2 ∨ -b^{3, 63}_1 ∨ -b^{3, 63}_0 ∨ false 
c  in DIMACS:
-6578 -6579 -6580  0

c i = 64
c  -2+1 --> -1
c    ( b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧  p_192) -> ( b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0)
c  in CNF:
c    -b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨  b^{3, 65}_2
c    -b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_1
c    -b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨  b^{3, 65}_0
c  in DIMACS:
-6581 -6582  6583 -192  6584 0
-6581 -6582  6583 -192 -6585 0
-6581 -6582  6583 -192  6586 0

c  -1+1 --> 0
c    ( b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0 ∧  p_192) -> (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧ -b^{3, 65}_0)
c  in CNF:
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_2
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_1
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_0
c  in DIMACS:
-6581  6582 -6583 -192 -6584 0
-6581  6582 -6583 -192 -6585 0
-6581  6582 -6583 -192 -6586 0

c  0+1 --> 1
c    (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧  p_192) -> (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0)
c  in CNF:
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_2
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_1
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨  b^{3, 65}_0
c  in DIMACS:
 6581  6582  6583 -192 -6584 0
 6581  6582  6583 -192 -6585 0
 6581  6582  6583 -192  6586 0

c  1+1 --> 2
c    (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0 ∧  p_192) -> (-b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0)
c  in CNF:
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_2
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨  b^{3, 65}_1
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ -p_192 ∨ -b^{3, 65}_0
c  in DIMACS:
 6581  6582 -6583 -192 -6584 0
 6581  6582 -6583 -192  6585 0
 6581  6582 -6583 -192 -6586 0

c  2+1 --> break 
c    (-b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧  p_192) -> break
c  in CNF:
c     b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 6581 -6582  6583 -192 1162 0


c  2-1 --> 1
c    (-b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧ -p_192) -> (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0)
c  in CNF:
c     b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_2
c     b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_1
c     b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨  b^{3, 65}_0
c  in DIMACS:
 6581 -6582  6583  192 -6584 0
 6581 -6582  6583  192 -6585 0
 6581 -6582  6583  192  6586 0

c  1-1 --> 0
c    (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0 ∧ -p_192) -> (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧ -b^{3, 65}_0)
c  in CNF:
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_2
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_1
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_0
c  in DIMACS:
 6581  6582 -6583  192 -6584 0
 6581  6582 -6583  192 -6585 0
 6581  6582 -6583  192 -6586 0

c  0-1 --> -1
c    (-b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧ -p_192) -> ( b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0)
c  in CNF:
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨  b^{3, 65}_2
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_1
c     b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨  b^{3, 65}_0
c  in DIMACS:
 6581  6582  6583  192  6584 0
 6581  6582  6583  192 -6585 0
 6581  6582  6583  192  6586 0

c  -1-1 --> -2
c    ( b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧  b^{3, 64}_0 ∧ -p_192) -> ( b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0)
c  in CNF:
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨  b^{3, 65}_2
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨  b^{3, 65}_1
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨  p_192 ∨ -b^{3, 65}_0
c  in DIMACS:
-6581  6582 -6583  192  6584 0
-6581  6582 -6583  192  6585 0
-6581  6582 -6583  192 -6586 0

c  -2-1 --> break 
c    ( b^{3, 64}_2 ∧  b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨  b^{3, 64}_0 ∨  p_192 ∨ break
c  in DIMACS:
-6581 -6582  6583  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 64}_2 ∧ -b^{3, 64}_1 ∧ -b^{3, 64}_0 ∧ true) 
c  in CNF:
c    -b^{3, 64}_2 ∨  b^{3, 64}_1 ∨  b^{3, 64}_0 ∨ false 
c  in DIMACS:
-6581  6582  6583  0

c  3 does not represent an automaton state.
c    -(-b^{3, 64}_2 ∧  b^{3, 64}_1 ∧  b^{3, 64}_0 ∧ true) 
c  in CNF:
c     b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ false 
c  in DIMACS:
 6581 -6582 -6583  0
c  -3 does not represent an automaton state.
c    -( b^{3, 64}_2 ∧  b^{3, 64}_1 ∧  b^{3, 64}_0 ∧ true) 
c  in CNF:
c    -b^{3, 64}_2 ∨ -b^{3, 64}_1 ∨ -b^{3, 64}_0 ∨ false 
c  in DIMACS:
-6581 -6582 -6583  0

c i = 65
c  -2+1 --> -1
c    ( b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧  p_195) -> ( b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0)
c  in CNF:
c    -b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨  b^{3, 66}_2
c    -b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_1
c    -b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨  b^{3, 66}_0
c  in DIMACS:
-6584 -6585  6586 -195  6587 0
-6584 -6585  6586 -195 -6588 0
-6584 -6585  6586 -195  6589 0

c  -1+1 --> 0
c    ( b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0 ∧  p_195) -> (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧ -b^{3, 66}_0)
c  in CNF:
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_2
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_1
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_0
c  in DIMACS:
-6584  6585 -6586 -195 -6587 0
-6584  6585 -6586 -195 -6588 0
-6584  6585 -6586 -195 -6589 0

c  0+1 --> 1
c    (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧  p_195) -> (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0)
c  in CNF:
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_2
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_1
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨  b^{3, 66}_0
c  in DIMACS:
 6584  6585  6586 -195 -6587 0
 6584  6585  6586 -195 -6588 0
 6584  6585  6586 -195  6589 0

c  1+1 --> 2
c    (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0 ∧  p_195) -> (-b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0)
c  in CNF:
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_2
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨  b^{3, 66}_1
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ -p_195 ∨ -b^{3, 66}_0
c  in DIMACS:
 6584  6585 -6586 -195 -6587 0
 6584  6585 -6586 -195  6588 0
 6584  6585 -6586 -195 -6589 0

c  2+1 --> break 
c    (-b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧  p_195) -> break
c  in CNF:
c     b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 6584 -6585  6586 -195 1162 0


c  2-1 --> 1
c    (-b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧ -p_195) -> (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0)
c  in CNF:
c     b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_2
c     b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_1
c     b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨  b^{3, 66}_0
c  in DIMACS:
 6584 -6585  6586  195 -6587 0
 6584 -6585  6586  195 -6588 0
 6584 -6585  6586  195  6589 0

c  1-1 --> 0
c    (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0 ∧ -p_195) -> (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧ -b^{3, 66}_0)
c  in CNF:
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_2
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_1
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_0
c  in DIMACS:
 6584  6585 -6586  195 -6587 0
 6584  6585 -6586  195 -6588 0
 6584  6585 -6586  195 -6589 0

c  0-1 --> -1
c    (-b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧ -p_195) -> ( b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0)
c  in CNF:
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨  b^{3, 66}_2
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_1
c     b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨  b^{3, 66}_0
c  in DIMACS:
 6584  6585  6586  195  6587 0
 6584  6585  6586  195 -6588 0
 6584  6585  6586  195  6589 0

c  -1-1 --> -2
c    ( b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧  b^{3, 65}_0 ∧ -p_195) -> ( b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0)
c  in CNF:
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨  b^{3, 66}_2
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨  b^{3, 66}_1
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨  p_195 ∨ -b^{3, 66}_0
c  in DIMACS:
-6584  6585 -6586  195  6587 0
-6584  6585 -6586  195  6588 0
-6584  6585 -6586  195 -6589 0

c  -2-1 --> break 
c    ( b^{3, 65}_2 ∧  b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨  b^{3, 65}_0 ∨  p_195 ∨ break
c  in DIMACS:
-6584 -6585  6586  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 65}_2 ∧ -b^{3, 65}_1 ∧ -b^{3, 65}_0 ∧ true) 
c  in CNF:
c    -b^{3, 65}_2 ∨  b^{3, 65}_1 ∨  b^{3, 65}_0 ∨ false 
c  in DIMACS:
-6584  6585  6586  0

c  3 does not represent an automaton state.
c    -(-b^{3, 65}_2 ∧  b^{3, 65}_1 ∧  b^{3, 65}_0 ∧ true) 
c  in CNF:
c     b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ false 
c  in DIMACS:
 6584 -6585 -6586  0
c  -3 does not represent an automaton state.
c    -( b^{3, 65}_2 ∧  b^{3, 65}_1 ∧  b^{3, 65}_0 ∧ true) 
c  in CNF:
c    -b^{3, 65}_2 ∨ -b^{3, 65}_1 ∨ -b^{3, 65}_0 ∨ false 
c  in DIMACS:
-6584 -6585 -6586  0

c i = 66
c  -2+1 --> -1
c    ( b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧  p_198) -> ( b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0)
c  in CNF:
c    -b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨  b^{3, 67}_2
c    -b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_1
c    -b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨  b^{3, 67}_0
c  in DIMACS:
-6587 -6588  6589 -198  6590 0
-6587 -6588  6589 -198 -6591 0
-6587 -6588  6589 -198  6592 0

c  -1+1 --> 0
c    ( b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0 ∧  p_198) -> (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧ -b^{3, 67}_0)
c  in CNF:
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_2
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_1
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_0
c  in DIMACS:
-6587  6588 -6589 -198 -6590 0
-6587  6588 -6589 -198 -6591 0
-6587  6588 -6589 -198 -6592 0

c  0+1 --> 1
c    (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧  p_198) -> (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0)
c  in CNF:
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_2
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_1
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨  b^{3, 67}_0
c  in DIMACS:
 6587  6588  6589 -198 -6590 0
 6587  6588  6589 -198 -6591 0
 6587  6588  6589 -198  6592 0

c  1+1 --> 2
c    (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0 ∧  p_198) -> (-b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0)
c  in CNF:
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_2
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨  b^{3, 67}_1
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ -p_198 ∨ -b^{3, 67}_0
c  in DIMACS:
 6587  6588 -6589 -198 -6590 0
 6587  6588 -6589 -198  6591 0
 6587  6588 -6589 -198 -6592 0

c  2+1 --> break 
c    (-b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧  p_198) -> break
c  in CNF:
c     b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 6587 -6588  6589 -198 1162 0


c  2-1 --> 1
c    (-b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧ -p_198) -> (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0)
c  in CNF:
c     b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_2
c     b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_1
c     b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨  b^{3, 67}_0
c  in DIMACS:
 6587 -6588  6589  198 -6590 0
 6587 -6588  6589  198 -6591 0
 6587 -6588  6589  198  6592 0

c  1-1 --> 0
c    (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0 ∧ -p_198) -> (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧ -b^{3, 67}_0)
c  in CNF:
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_2
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_1
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_0
c  in DIMACS:
 6587  6588 -6589  198 -6590 0
 6587  6588 -6589  198 -6591 0
 6587  6588 -6589  198 -6592 0

c  0-1 --> -1
c    (-b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧ -p_198) -> ( b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0)
c  in CNF:
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨  b^{3, 67}_2
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_1
c     b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨  b^{3, 67}_0
c  in DIMACS:
 6587  6588  6589  198  6590 0
 6587  6588  6589  198 -6591 0
 6587  6588  6589  198  6592 0

c  -1-1 --> -2
c    ( b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧  b^{3, 66}_0 ∧ -p_198) -> ( b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0)
c  in CNF:
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨  b^{3, 67}_2
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨  b^{3, 67}_1
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨  p_198 ∨ -b^{3, 67}_0
c  in DIMACS:
-6587  6588 -6589  198  6590 0
-6587  6588 -6589  198  6591 0
-6587  6588 -6589  198 -6592 0

c  -2-1 --> break 
c    ( b^{3, 66}_2 ∧  b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨  b^{3, 66}_0 ∨  p_198 ∨ break
c  in DIMACS:
-6587 -6588  6589  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 66}_2 ∧ -b^{3, 66}_1 ∧ -b^{3, 66}_0 ∧ true) 
c  in CNF:
c    -b^{3, 66}_2 ∨  b^{3, 66}_1 ∨  b^{3, 66}_0 ∨ false 
c  in DIMACS:
-6587  6588  6589  0

c  3 does not represent an automaton state.
c    -(-b^{3, 66}_2 ∧  b^{3, 66}_1 ∧  b^{3, 66}_0 ∧ true) 
c  in CNF:
c     b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ false 
c  in DIMACS:
 6587 -6588 -6589  0
c  -3 does not represent an automaton state.
c    -( b^{3, 66}_2 ∧  b^{3, 66}_1 ∧  b^{3, 66}_0 ∧ true) 
c  in CNF:
c    -b^{3, 66}_2 ∨ -b^{3, 66}_1 ∨ -b^{3, 66}_0 ∨ false 
c  in DIMACS:
-6587 -6588 -6589  0

c i = 67
c  -2+1 --> -1
c    ( b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧  p_201) -> ( b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0)
c  in CNF:
c    -b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨  b^{3, 68}_2
c    -b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_1
c    -b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨  b^{3, 68}_0
c  in DIMACS:
-6590 -6591  6592 -201  6593 0
-6590 -6591  6592 -201 -6594 0
-6590 -6591  6592 -201  6595 0

c  -1+1 --> 0
c    ( b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0 ∧  p_201) -> (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧ -b^{3, 68}_0)
c  in CNF:
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_2
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_1
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_0
c  in DIMACS:
-6590  6591 -6592 -201 -6593 0
-6590  6591 -6592 -201 -6594 0
-6590  6591 -6592 -201 -6595 0

c  0+1 --> 1
c    (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧  p_201) -> (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0)
c  in CNF:
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_2
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_1
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨  b^{3, 68}_0
c  in DIMACS:
 6590  6591  6592 -201 -6593 0
 6590  6591  6592 -201 -6594 0
 6590  6591  6592 -201  6595 0

c  1+1 --> 2
c    (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0 ∧  p_201) -> (-b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0)
c  in CNF:
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_2
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨  b^{3, 68}_1
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ -p_201 ∨ -b^{3, 68}_0
c  in DIMACS:
 6590  6591 -6592 -201 -6593 0
 6590  6591 -6592 -201  6594 0
 6590  6591 -6592 -201 -6595 0

c  2+1 --> break 
c    (-b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧  p_201) -> break
c  in CNF:
c     b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ -p_201 ∨ break
c  in DIMACS:
 6590 -6591  6592 -201 1162 0


c  2-1 --> 1
c    (-b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧ -p_201) -> (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0)
c  in CNF:
c     b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_2
c     b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_1
c     b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨  b^{3, 68}_0
c  in DIMACS:
 6590 -6591  6592  201 -6593 0
 6590 -6591  6592  201 -6594 0
 6590 -6591  6592  201  6595 0

c  1-1 --> 0
c    (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0 ∧ -p_201) -> (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧ -b^{3, 68}_0)
c  in CNF:
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_2
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_1
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_0
c  in DIMACS:
 6590  6591 -6592  201 -6593 0
 6590  6591 -6592  201 -6594 0
 6590  6591 -6592  201 -6595 0

c  0-1 --> -1
c    (-b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧ -p_201) -> ( b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0)
c  in CNF:
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨  b^{3, 68}_2
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_1
c     b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨  b^{3, 68}_0
c  in DIMACS:
 6590  6591  6592  201  6593 0
 6590  6591  6592  201 -6594 0
 6590  6591  6592  201  6595 0

c  -1-1 --> -2
c    ( b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧  b^{3, 67}_0 ∧ -p_201) -> ( b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0)
c  in CNF:
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨  b^{3, 68}_2
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨  b^{3, 68}_1
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨  p_201 ∨ -b^{3, 68}_0
c  in DIMACS:
-6590  6591 -6592  201  6593 0
-6590  6591 -6592  201  6594 0
-6590  6591 -6592  201 -6595 0

c  -2-1 --> break 
c    ( b^{3, 67}_2 ∧  b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧ -p_201) -> break
c  in CNF:
c    -b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨  b^{3, 67}_0 ∨  p_201 ∨ break
c  in DIMACS:
-6590 -6591  6592  201 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 67}_2 ∧ -b^{3, 67}_1 ∧ -b^{3, 67}_0 ∧ true) 
c  in CNF:
c    -b^{3, 67}_2 ∨  b^{3, 67}_1 ∨  b^{3, 67}_0 ∨ false 
c  in DIMACS:
-6590  6591  6592  0

c  3 does not represent an automaton state.
c    -(-b^{3, 67}_2 ∧  b^{3, 67}_1 ∧  b^{3, 67}_0 ∧ true) 
c  in CNF:
c     b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ false 
c  in DIMACS:
 6590 -6591 -6592  0
c  -3 does not represent an automaton state.
c    -( b^{3, 67}_2 ∧  b^{3, 67}_1 ∧  b^{3, 67}_0 ∧ true) 
c  in CNF:
c    -b^{3, 67}_2 ∨ -b^{3, 67}_1 ∨ -b^{3, 67}_0 ∨ false 
c  in DIMACS:
-6590 -6591 -6592  0

c i = 68
c  -2+1 --> -1
c    ( b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧  p_204) -> ( b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0)
c  in CNF:
c    -b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨  b^{3, 69}_2
c    -b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_1
c    -b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨  b^{3, 69}_0
c  in DIMACS:
-6593 -6594  6595 -204  6596 0
-6593 -6594  6595 -204 -6597 0
-6593 -6594  6595 -204  6598 0

c  -1+1 --> 0
c    ( b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0 ∧  p_204) -> (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧ -b^{3, 69}_0)
c  in CNF:
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_2
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_1
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_0
c  in DIMACS:
-6593  6594 -6595 -204 -6596 0
-6593  6594 -6595 -204 -6597 0
-6593  6594 -6595 -204 -6598 0

c  0+1 --> 1
c    (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧  p_204) -> (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0)
c  in CNF:
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_2
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_1
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨  b^{3, 69}_0
c  in DIMACS:
 6593  6594  6595 -204 -6596 0
 6593  6594  6595 -204 -6597 0
 6593  6594  6595 -204  6598 0

c  1+1 --> 2
c    (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0 ∧  p_204) -> (-b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0)
c  in CNF:
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_2
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨  b^{3, 69}_1
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ -p_204 ∨ -b^{3, 69}_0
c  in DIMACS:
 6593  6594 -6595 -204 -6596 0
 6593  6594 -6595 -204  6597 0
 6593  6594 -6595 -204 -6598 0

c  2+1 --> break 
c    (-b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧  p_204) -> break
c  in CNF:
c     b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 6593 -6594  6595 -204 1162 0


c  2-1 --> 1
c    (-b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧ -p_204) -> (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0)
c  in CNF:
c     b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_2
c     b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_1
c     b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨  b^{3, 69}_0
c  in DIMACS:
 6593 -6594  6595  204 -6596 0
 6593 -6594  6595  204 -6597 0
 6593 -6594  6595  204  6598 0

c  1-1 --> 0
c    (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0 ∧ -p_204) -> (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧ -b^{3, 69}_0)
c  in CNF:
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_2
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_1
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_0
c  in DIMACS:
 6593  6594 -6595  204 -6596 0
 6593  6594 -6595  204 -6597 0
 6593  6594 -6595  204 -6598 0

c  0-1 --> -1
c    (-b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧ -p_204) -> ( b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0)
c  in CNF:
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨  b^{3, 69}_2
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_1
c     b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨  b^{3, 69}_0
c  in DIMACS:
 6593  6594  6595  204  6596 0
 6593  6594  6595  204 -6597 0
 6593  6594  6595  204  6598 0

c  -1-1 --> -2
c    ( b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧  b^{3, 68}_0 ∧ -p_204) -> ( b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0)
c  in CNF:
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨  b^{3, 69}_2
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨  b^{3, 69}_1
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨  p_204 ∨ -b^{3, 69}_0
c  in DIMACS:
-6593  6594 -6595  204  6596 0
-6593  6594 -6595  204  6597 0
-6593  6594 -6595  204 -6598 0

c  -2-1 --> break 
c    ( b^{3, 68}_2 ∧  b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨  b^{3, 68}_0 ∨  p_204 ∨ break
c  in DIMACS:
-6593 -6594  6595  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 68}_2 ∧ -b^{3, 68}_1 ∧ -b^{3, 68}_0 ∧ true) 
c  in CNF:
c    -b^{3, 68}_2 ∨  b^{3, 68}_1 ∨  b^{3, 68}_0 ∨ false 
c  in DIMACS:
-6593  6594  6595  0

c  3 does not represent an automaton state.
c    -(-b^{3, 68}_2 ∧  b^{3, 68}_1 ∧  b^{3, 68}_0 ∧ true) 
c  in CNF:
c     b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ false 
c  in DIMACS:
 6593 -6594 -6595  0
c  -3 does not represent an automaton state.
c    -( b^{3, 68}_2 ∧  b^{3, 68}_1 ∧  b^{3, 68}_0 ∧ true) 
c  in CNF:
c    -b^{3, 68}_2 ∨ -b^{3, 68}_1 ∨ -b^{3, 68}_0 ∨ false 
c  in DIMACS:
-6593 -6594 -6595  0

c i = 69
c  -2+1 --> -1
c    ( b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧  p_207) -> ( b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0)
c  in CNF:
c    -b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨  b^{3, 70}_2
c    -b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_1
c    -b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨  b^{3, 70}_0
c  in DIMACS:
-6596 -6597  6598 -207  6599 0
-6596 -6597  6598 -207 -6600 0
-6596 -6597  6598 -207  6601 0

c  -1+1 --> 0
c    ( b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0 ∧  p_207) -> (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧ -b^{3, 70}_0)
c  in CNF:
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_2
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_1
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_0
c  in DIMACS:
-6596  6597 -6598 -207 -6599 0
-6596  6597 -6598 -207 -6600 0
-6596  6597 -6598 -207 -6601 0

c  0+1 --> 1
c    (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧  p_207) -> (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0)
c  in CNF:
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_2
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_1
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨  b^{3, 70}_0
c  in DIMACS:
 6596  6597  6598 -207 -6599 0
 6596  6597  6598 -207 -6600 0
 6596  6597  6598 -207  6601 0

c  1+1 --> 2
c    (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0 ∧  p_207) -> (-b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0)
c  in CNF:
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_2
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨  b^{3, 70}_1
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ -p_207 ∨ -b^{3, 70}_0
c  in DIMACS:
 6596  6597 -6598 -207 -6599 0
 6596  6597 -6598 -207  6600 0
 6596  6597 -6598 -207 -6601 0

c  2+1 --> break 
c    (-b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧  p_207) -> break
c  in CNF:
c     b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 6596 -6597  6598 -207 1162 0


c  2-1 --> 1
c    (-b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧ -p_207) -> (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0)
c  in CNF:
c     b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_2
c     b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_1
c     b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨  b^{3, 70}_0
c  in DIMACS:
 6596 -6597  6598  207 -6599 0
 6596 -6597  6598  207 -6600 0
 6596 -6597  6598  207  6601 0

c  1-1 --> 0
c    (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0 ∧ -p_207) -> (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧ -b^{3, 70}_0)
c  in CNF:
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_2
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_1
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_0
c  in DIMACS:
 6596  6597 -6598  207 -6599 0
 6596  6597 -6598  207 -6600 0
 6596  6597 -6598  207 -6601 0

c  0-1 --> -1
c    (-b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧ -p_207) -> ( b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0)
c  in CNF:
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨  b^{3, 70}_2
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_1
c     b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨  b^{3, 70}_0
c  in DIMACS:
 6596  6597  6598  207  6599 0
 6596  6597  6598  207 -6600 0
 6596  6597  6598  207  6601 0

c  -1-1 --> -2
c    ( b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧  b^{3, 69}_0 ∧ -p_207) -> ( b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0)
c  in CNF:
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨  b^{3, 70}_2
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨  b^{3, 70}_1
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨  p_207 ∨ -b^{3, 70}_0
c  in DIMACS:
-6596  6597 -6598  207  6599 0
-6596  6597 -6598  207  6600 0
-6596  6597 -6598  207 -6601 0

c  -2-1 --> break 
c    ( b^{3, 69}_2 ∧  b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨  b^{3, 69}_0 ∨  p_207 ∨ break
c  in DIMACS:
-6596 -6597  6598  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 69}_2 ∧ -b^{3, 69}_1 ∧ -b^{3, 69}_0 ∧ true) 
c  in CNF:
c    -b^{3, 69}_2 ∨  b^{3, 69}_1 ∨  b^{3, 69}_0 ∨ false 
c  in DIMACS:
-6596  6597  6598  0

c  3 does not represent an automaton state.
c    -(-b^{3, 69}_2 ∧  b^{3, 69}_1 ∧  b^{3, 69}_0 ∧ true) 
c  in CNF:
c     b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ false 
c  in DIMACS:
 6596 -6597 -6598  0
c  -3 does not represent an automaton state.
c    -( b^{3, 69}_2 ∧  b^{3, 69}_1 ∧  b^{3, 69}_0 ∧ true) 
c  in CNF:
c    -b^{3, 69}_2 ∨ -b^{3, 69}_1 ∨ -b^{3, 69}_0 ∨ false 
c  in DIMACS:
-6596 -6597 -6598  0

c i = 70
c  -2+1 --> -1
c    ( b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧  p_210) -> ( b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0)
c  in CNF:
c    -b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨  b^{3, 71}_2
c    -b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_1
c    -b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨  b^{3, 71}_0
c  in DIMACS:
-6599 -6600  6601 -210  6602 0
-6599 -6600  6601 -210 -6603 0
-6599 -6600  6601 -210  6604 0

c  -1+1 --> 0
c    ( b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0 ∧  p_210) -> (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧ -b^{3, 71}_0)
c  in CNF:
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_2
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_1
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_0
c  in DIMACS:
-6599  6600 -6601 -210 -6602 0
-6599  6600 -6601 -210 -6603 0
-6599  6600 -6601 -210 -6604 0

c  0+1 --> 1
c    (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧  p_210) -> (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0)
c  in CNF:
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_2
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_1
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨  b^{3, 71}_0
c  in DIMACS:
 6599  6600  6601 -210 -6602 0
 6599  6600  6601 -210 -6603 0
 6599  6600  6601 -210  6604 0

c  1+1 --> 2
c    (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0 ∧  p_210) -> (-b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0)
c  in CNF:
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_2
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨  b^{3, 71}_1
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ -p_210 ∨ -b^{3, 71}_0
c  in DIMACS:
 6599  6600 -6601 -210 -6602 0
 6599  6600 -6601 -210  6603 0
 6599  6600 -6601 -210 -6604 0

c  2+1 --> break 
c    (-b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧  p_210) -> break
c  in CNF:
c     b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 6599 -6600  6601 -210 1162 0


c  2-1 --> 1
c    (-b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧ -p_210) -> (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0)
c  in CNF:
c     b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_2
c     b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_1
c     b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨  b^{3, 71}_0
c  in DIMACS:
 6599 -6600  6601  210 -6602 0
 6599 -6600  6601  210 -6603 0
 6599 -6600  6601  210  6604 0

c  1-1 --> 0
c    (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0 ∧ -p_210) -> (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧ -b^{3, 71}_0)
c  in CNF:
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_2
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_1
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_0
c  in DIMACS:
 6599  6600 -6601  210 -6602 0
 6599  6600 -6601  210 -6603 0
 6599  6600 -6601  210 -6604 0

c  0-1 --> -1
c    (-b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧ -p_210) -> ( b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0)
c  in CNF:
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨  b^{3, 71}_2
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_1
c     b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨  b^{3, 71}_0
c  in DIMACS:
 6599  6600  6601  210  6602 0
 6599  6600  6601  210 -6603 0
 6599  6600  6601  210  6604 0

c  -1-1 --> -2
c    ( b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧  b^{3, 70}_0 ∧ -p_210) -> ( b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0)
c  in CNF:
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨  b^{3, 71}_2
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨  b^{3, 71}_1
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨  p_210 ∨ -b^{3, 71}_0
c  in DIMACS:
-6599  6600 -6601  210  6602 0
-6599  6600 -6601  210  6603 0
-6599  6600 -6601  210 -6604 0

c  -2-1 --> break 
c    ( b^{3, 70}_2 ∧  b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨  b^{3, 70}_0 ∨  p_210 ∨ break
c  in DIMACS:
-6599 -6600  6601  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 70}_2 ∧ -b^{3, 70}_1 ∧ -b^{3, 70}_0 ∧ true) 
c  in CNF:
c    -b^{3, 70}_2 ∨  b^{3, 70}_1 ∨  b^{3, 70}_0 ∨ false 
c  in DIMACS:
-6599  6600  6601  0

c  3 does not represent an automaton state.
c    -(-b^{3, 70}_2 ∧  b^{3, 70}_1 ∧  b^{3, 70}_0 ∧ true) 
c  in CNF:
c     b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ false 
c  in DIMACS:
 6599 -6600 -6601  0
c  -3 does not represent an automaton state.
c    -( b^{3, 70}_2 ∧  b^{3, 70}_1 ∧  b^{3, 70}_0 ∧ true) 
c  in CNF:
c    -b^{3, 70}_2 ∨ -b^{3, 70}_1 ∨ -b^{3, 70}_0 ∨ false 
c  in DIMACS:
-6599 -6600 -6601  0

c i = 71
c  -2+1 --> -1
c    ( b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧  p_213) -> ( b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0)
c  in CNF:
c    -b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨  b^{3, 72}_2
c    -b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_1
c    -b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨  b^{3, 72}_0
c  in DIMACS:
-6602 -6603  6604 -213  6605 0
-6602 -6603  6604 -213 -6606 0
-6602 -6603  6604 -213  6607 0

c  -1+1 --> 0
c    ( b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0 ∧  p_213) -> (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧ -b^{3, 72}_0)
c  in CNF:
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_2
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_1
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_0
c  in DIMACS:
-6602  6603 -6604 -213 -6605 0
-6602  6603 -6604 -213 -6606 0
-6602  6603 -6604 -213 -6607 0

c  0+1 --> 1
c    (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧  p_213) -> (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0)
c  in CNF:
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_2
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_1
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨  b^{3, 72}_0
c  in DIMACS:
 6602  6603  6604 -213 -6605 0
 6602  6603  6604 -213 -6606 0
 6602  6603  6604 -213  6607 0

c  1+1 --> 2
c    (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0 ∧  p_213) -> (-b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0)
c  in CNF:
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_2
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨  b^{3, 72}_1
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ -p_213 ∨ -b^{3, 72}_0
c  in DIMACS:
 6602  6603 -6604 -213 -6605 0
 6602  6603 -6604 -213  6606 0
 6602  6603 -6604 -213 -6607 0

c  2+1 --> break 
c    (-b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧  p_213) -> break
c  in CNF:
c     b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ -p_213 ∨ break
c  in DIMACS:
 6602 -6603  6604 -213 1162 0


c  2-1 --> 1
c    (-b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧ -p_213) -> (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0)
c  in CNF:
c     b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_2
c     b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_1
c     b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨  b^{3, 72}_0
c  in DIMACS:
 6602 -6603  6604  213 -6605 0
 6602 -6603  6604  213 -6606 0
 6602 -6603  6604  213  6607 0

c  1-1 --> 0
c    (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0 ∧ -p_213) -> (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧ -b^{3, 72}_0)
c  in CNF:
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_2
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_1
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_0
c  in DIMACS:
 6602  6603 -6604  213 -6605 0
 6602  6603 -6604  213 -6606 0
 6602  6603 -6604  213 -6607 0

c  0-1 --> -1
c    (-b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧ -p_213) -> ( b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0)
c  in CNF:
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨  b^{3, 72}_2
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_1
c     b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨  b^{3, 72}_0
c  in DIMACS:
 6602  6603  6604  213  6605 0
 6602  6603  6604  213 -6606 0
 6602  6603  6604  213  6607 0

c  -1-1 --> -2
c    ( b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧  b^{3, 71}_0 ∧ -p_213) -> ( b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0)
c  in CNF:
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨  b^{3, 72}_2
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨  b^{3, 72}_1
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨  p_213 ∨ -b^{3, 72}_0
c  in DIMACS:
-6602  6603 -6604  213  6605 0
-6602  6603 -6604  213  6606 0
-6602  6603 -6604  213 -6607 0

c  -2-1 --> break 
c    ( b^{3, 71}_2 ∧  b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧ -p_213) -> break
c  in CNF:
c    -b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨  b^{3, 71}_0 ∨  p_213 ∨ break
c  in DIMACS:
-6602 -6603  6604  213 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 71}_2 ∧ -b^{3, 71}_1 ∧ -b^{3, 71}_0 ∧ true) 
c  in CNF:
c    -b^{3, 71}_2 ∨  b^{3, 71}_1 ∨  b^{3, 71}_0 ∨ false 
c  in DIMACS:
-6602  6603  6604  0

c  3 does not represent an automaton state.
c    -(-b^{3, 71}_2 ∧  b^{3, 71}_1 ∧  b^{3, 71}_0 ∧ true) 
c  in CNF:
c     b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ false 
c  in DIMACS:
 6602 -6603 -6604  0
c  -3 does not represent an automaton state.
c    -( b^{3, 71}_2 ∧  b^{3, 71}_1 ∧  b^{3, 71}_0 ∧ true) 
c  in CNF:
c    -b^{3, 71}_2 ∨ -b^{3, 71}_1 ∨ -b^{3, 71}_0 ∨ false 
c  in DIMACS:
-6602 -6603 -6604  0

c i = 72
c  -2+1 --> -1
c    ( b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧  p_216) -> ( b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0)
c  in CNF:
c    -b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨  b^{3, 73}_2
c    -b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_1
c    -b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨  b^{3, 73}_0
c  in DIMACS:
-6605 -6606  6607 -216  6608 0
-6605 -6606  6607 -216 -6609 0
-6605 -6606  6607 -216  6610 0

c  -1+1 --> 0
c    ( b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0 ∧  p_216) -> (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧ -b^{3, 73}_0)
c  in CNF:
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_2
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_1
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_0
c  in DIMACS:
-6605  6606 -6607 -216 -6608 0
-6605  6606 -6607 -216 -6609 0
-6605  6606 -6607 -216 -6610 0

c  0+1 --> 1
c    (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧  p_216) -> (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0)
c  in CNF:
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_2
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_1
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨  b^{3, 73}_0
c  in DIMACS:
 6605  6606  6607 -216 -6608 0
 6605  6606  6607 -216 -6609 0
 6605  6606  6607 -216  6610 0

c  1+1 --> 2
c    (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0 ∧  p_216) -> (-b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0)
c  in CNF:
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_2
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨  b^{3, 73}_1
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ -p_216 ∨ -b^{3, 73}_0
c  in DIMACS:
 6605  6606 -6607 -216 -6608 0
 6605  6606 -6607 -216  6609 0
 6605  6606 -6607 -216 -6610 0

c  2+1 --> break 
c    (-b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧  p_216) -> break
c  in CNF:
c     b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 6605 -6606  6607 -216 1162 0


c  2-1 --> 1
c    (-b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧ -p_216) -> (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0)
c  in CNF:
c     b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_2
c     b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_1
c     b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨  b^{3, 73}_0
c  in DIMACS:
 6605 -6606  6607  216 -6608 0
 6605 -6606  6607  216 -6609 0
 6605 -6606  6607  216  6610 0

c  1-1 --> 0
c    (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0 ∧ -p_216) -> (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧ -b^{3, 73}_0)
c  in CNF:
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_2
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_1
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_0
c  in DIMACS:
 6605  6606 -6607  216 -6608 0
 6605  6606 -6607  216 -6609 0
 6605  6606 -6607  216 -6610 0

c  0-1 --> -1
c    (-b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧ -p_216) -> ( b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0)
c  in CNF:
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨  b^{3, 73}_2
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_1
c     b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨  b^{3, 73}_0
c  in DIMACS:
 6605  6606  6607  216  6608 0
 6605  6606  6607  216 -6609 0
 6605  6606  6607  216  6610 0

c  -1-1 --> -2
c    ( b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧  b^{3, 72}_0 ∧ -p_216) -> ( b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0)
c  in CNF:
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨  b^{3, 73}_2
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨  b^{3, 73}_1
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨  p_216 ∨ -b^{3, 73}_0
c  in DIMACS:
-6605  6606 -6607  216  6608 0
-6605  6606 -6607  216  6609 0
-6605  6606 -6607  216 -6610 0

c  -2-1 --> break 
c    ( b^{3, 72}_2 ∧  b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨  b^{3, 72}_0 ∨  p_216 ∨ break
c  in DIMACS:
-6605 -6606  6607  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 72}_2 ∧ -b^{3, 72}_1 ∧ -b^{3, 72}_0 ∧ true) 
c  in CNF:
c    -b^{3, 72}_2 ∨  b^{3, 72}_1 ∨  b^{3, 72}_0 ∨ false 
c  in DIMACS:
-6605  6606  6607  0

c  3 does not represent an automaton state.
c    -(-b^{3, 72}_2 ∧  b^{3, 72}_1 ∧  b^{3, 72}_0 ∧ true) 
c  in CNF:
c     b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ false 
c  in DIMACS:
 6605 -6606 -6607  0
c  -3 does not represent an automaton state.
c    -( b^{3, 72}_2 ∧  b^{3, 72}_1 ∧  b^{3, 72}_0 ∧ true) 
c  in CNF:
c    -b^{3, 72}_2 ∨ -b^{3, 72}_1 ∨ -b^{3, 72}_0 ∨ false 
c  in DIMACS:
-6605 -6606 -6607  0

c i = 73
c  -2+1 --> -1
c    ( b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧  p_219) -> ( b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0)
c  in CNF:
c    -b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨  b^{3, 74}_2
c    -b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_1
c    -b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨  b^{3, 74}_0
c  in DIMACS:
-6608 -6609  6610 -219  6611 0
-6608 -6609  6610 -219 -6612 0
-6608 -6609  6610 -219  6613 0

c  -1+1 --> 0
c    ( b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0 ∧  p_219) -> (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧ -b^{3, 74}_0)
c  in CNF:
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_2
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_1
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_0
c  in DIMACS:
-6608  6609 -6610 -219 -6611 0
-6608  6609 -6610 -219 -6612 0
-6608  6609 -6610 -219 -6613 0

c  0+1 --> 1
c    (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧  p_219) -> (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0)
c  in CNF:
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_2
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_1
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨  b^{3, 74}_0
c  in DIMACS:
 6608  6609  6610 -219 -6611 0
 6608  6609  6610 -219 -6612 0
 6608  6609  6610 -219  6613 0

c  1+1 --> 2
c    (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0 ∧  p_219) -> (-b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0)
c  in CNF:
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_2
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨  b^{3, 74}_1
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ -p_219 ∨ -b^{3, 74}_0
c  in DIMACS:
 6608  6609 -6610 -219 -6611 0
 6608  6609 -6610 -219  6612 0
 6608  6609 -6610 -219 -6613 0

c  2+1 --> break 
c    (-b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧  p_219) -> break
c  in CNF:
c     b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ -p_219 ∨ break
c  in DIMACS:
 6608 -6609  6610 -219 1162 0


c  2-1 --> 1
c    (-b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧ -p_219) -> (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0)
c  in CNF:
c     b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_2
c     b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_1
c     b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨  b^{3, 74}_0
c  in DIMACS:
 6608 -6609  6610  219 -6611 0
 6608 -6609  6610  219 -6612 0
 6608 -6609  6610  219  6613 0

c  1-1 --> 0
c    (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0 ∧ -p_219) -> (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧ -b^{3, 74}_0)
c  in CNF:
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_2
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_1
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_0
c  in DIMACS:
 6608  6609 -6610  219 -6611 0
 6608  6609 -6610  219 -6612 0
 6608  6609 -6610  219 -6613 0

c  0-1 --> -1
c    (-b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧ -p_219) -> ( b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0)
c  in CNF:
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨  b^{3, 74}_2
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_1
c     b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨  b^{3, 74}_0
c  in DIMACS:
 6608  6609  6610  219  6611 0
 6608  6609  6610  219 -6612 0
 6608  6609  6610  219  6613 0

c  -1-1 --> -2
c    ( b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧  b^{3, 73}_0 ∧ -p_219) -> ( b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0)
c  in CNF:
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨  b^{3, 74}_2
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨  b^{3, 74}_1
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨  p_219 ∨ -b^{3, 74}_0
c  in DIMACS:
-6608  6609 -6610  219  6611 0
-6608  6609 -6610  219  6612 0
-6608  6609 -6610  219 -6613 0

c  -2-1 --> break 
c    ( b^{3, 73}_2 ∧  b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧ -p_219) -> break
c  in CNF:
c    -b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨  b^{3, 73}_0 ∨  p_219 ∨ break
c  in DIMACS:
-6608 -6609  6610  219 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 73}_2 ∧ -b^{3, 73}_1 ∧ -b^{3, 73}_0 ∧ true) 
c  in CNF:
c    -b^{3, 73}_2 ∨  b^{3, 73}_1 ∨  b^{3, 73}_0 ∨ false 
c  in DIMACS:
-6608  6609  6610  0

c  3 does not represent an automaton state.
c    -(-b^{3, 73}_2 ∧  b^{3, 73}_1 ∧  b^{3, 73}_0 ∧ true) 
c  in CNF:
c     b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ false 
c  in DIMACS:
 6608 -6609 -6610  0
c  -3 does not represent an automaton state.
c    -( b^{3, 73}_2 ∧  b^{3, 73}_1 ∧  b^{3, 73}_0 ∧ true) 
c  in CNF:
c    -b^{3, 73}_2 ∨ -b^{3, 73}_1 ∨ -b^{3, 73}_0 ∨ false 
c  in DIMACS:
-6608 -6609 -6610  0

c i = 74
c  -2+1 --> -1
c    ( b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧  p_222) -> ( b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0)
c  in CNF:
c    -b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨  b^{3, 75}_2
c    -b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_1
c    -b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨  b^{3, 75}_0
c  in DIMACS:
-6611 -6612  6613 -222  6614 0
-6611 -6612  6613 -222 -6615 0
-6611 -6612  6613 -222  6616 0

c  -1+1 --> 0
c    ( b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0 ∧  p_222) -> (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧ -b^{3, 75}_0)
c  in CNF:
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_2
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_1
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_0
c  in DIMACS:
-6611  6612 -6613 -222 -6614 0
-6611  6612 -6613 -222 -6615 0
-6611  6612 -6613 -222 -6616 0

c  0+1 --> 1
c    (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧  p_222) -> (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0)
c  in CNF:
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_2
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_1
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨  b^{3, 75}_0
c  in DIMACS:
 6611  6612  6613 -222 -6614 0
 6611  6612  6613 -222 -6615 0
 6611  6612  6613 -222  6616 0

c  1+1 --> 2
c    (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0 ∧  p_222) -> (-b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0)
c  in CNF:
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_2
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨  b^{3, 75}_1
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ -p_222 ∨ -b^{3, 75}_0
c  in DIMACS:
 6611  6612 -6613 -222 -6614 0
 6611  6612 -6613 -222  6615 0
 6611  6612 -6613 -222 -6616 0

c  2+1 --> break 
c    (-b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧  p_222) -> break
c  in CNF:
c     b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 6611 -6612  6613 -222 1162 0


c  2-1 --> 1
c    (-b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧ -p_222) -> (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0)
c  in CNF:
c     b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_2
c     b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_1
c     b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨  b^{3, 75}_0
c  in DIMACS:
 6611 -6612  6613  222 -6614 0
 6611 -6612  6613  222 -6615 0
 6611 -6612  6613  222  6616 0

c  1-1 --> 0
c    (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0 ∧ -p_222) -> (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧ -b^{3, 75}_0)
c  in CNF:
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_2
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_1
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_0
c  in DIMACS:
 6611  6612 -6613  222 -6614 0
 6611  6612 -6613  222 -6615 0
 6611  6612 -6613  222 -6616 0

c  0-1 --> -1
c    (-b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧ -p_222) -> ( b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0)
c  in CNF:
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨  b^{3, 75}_2
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_1
c     b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨  b^{3, 75}_0
c  in DIMACS:
 6611  6612  6613  222  6614 0
 6611  6612  6613  222 -6615 0
 6611  6612  6613  222  6616 0

c  -1-1 --> -2
c    ( b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧  b^{3, 74}_0 ∧ -p_222) -> ( b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0)
c  in CNF:
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨  b^{3, 75}_2
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨  b^{3, 75}_1
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨  p_222 ∨ -b^{3, 75}_0
c  in DIMACS:
-6611  6612 -6613  222  6614 0
-6611  6612 -6613  222  6615 0
-6611  6612 -6613  222 -6616 0

c  -2-1 --> break 
c    ( b^{3, 74}_2 ∧  b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨  b^{3, 74}_0 ∨  p_222 ∨ break
c  in DIMACS:
-6611 -6612  6613  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 74}_2 ∧ -b^{3, 74}_1 ∧ -b^{3, 74}_0 ∧ true) 
c  in CNF:
c    -b^{3, 74}_2 ∨  b^{3, 74}_1 ∨  b^{3, 74}_0 ∨ false 
c  in DIMACS:
-6611  6612  6613  0

c  3 does not represent an automaton state.
c    -(-b^{3, 74}_2 ∧  b^{3, 74}_1 ∧  b^{3, 74}_0 ∧ true) 
c  in CNF:
c     b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ false 
c  in DIMACS:
 6611 -6612 -6613  0
c  -3 does not represent an automaton state.
c    -( b^{3, 74}_2 ∧  b^{3, 74}_1 ∧  b^{3, 74}_0 ∧ true) 
c  in CNF:
c    -b^{3, 74}_2 ∨ -b^{3, 74}_1 ∨ -b^{3, 74}_0 ∨ false 
c  in DIMACS:
-6611 -6612 -6613  0

c i = 75
c  -2+1 --> -1
c    ( b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧  p_225) -> ( b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0)
c  in CNF:
c    -b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨  b^{3, 76}_2
c    -b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_1
c    -b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨  b^{3, 76}_0
c  in DIMACS:
-6614 -6615  6616 -225  6617 0
-6614 -6615  6616 -225 -6618 0
-6614 -6615  6616 -225  6619 0

c  -1+1 --> 0
c    ( b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0 ∧  p_225) -> (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧ -b^{3, 76}_0)
c  in CNF:
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_2
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_1
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_0
c  in DIMACS:
-6614  6615 -6616 -225 -6617 0
-6614  6615 -6616 -225 -6618 0
-6614  6615 -6616 -225 -6619 0

c  0+1 --> 1
c    (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧  p_225) -> (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0)
c  in CNF:
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_2
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_1
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨  b^{3, 76}_0
c  in DIMACS:
 6614  6615  6616 -225 -6617 0
 6614  6615  6616 -225 -6618 0
 6614  6615  6616 -225  6619 0

c  1+1 --> 2
c    (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0 ∧  p_225) -> (-b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0)
c  in CNF:
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_2
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨  b^{3, 76}_1
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ -p_225 ∨ -b^{3, 76}_0
c  in DIMACS:
 6614  6615 -6616 -225 -6617 0
 6614  6615 -6616 -225  6618 0
 6614  6615 -6616 -225 -6619 0

c  2+1 --> break 
c    (-b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧  p_225) -> break
c  in CNF:
c     b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 6614 -6615  6616 -225 1162 0


c  2-1 --> 1
c    (-b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧ -p_225) -> (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0)
c  in CNF:
c     b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_2
c     b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_1
c     b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨  b^{3, 76}_0
c  in DIMACS:
 6614 -6615  6616  225 -6617 0
 6614 -6615  6616  225 -6618 0
 6614 -6615  6616  225  6619 0

c  1-1 --> 0
c    (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0 ∧ -p_225) -> (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧ -b^{3, 76}_0)
c  in CNF:
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_2
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_1
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_0
c  in DIMACS:
 6614  6615 -6616  225 -6617 0
 6614  6615 -6616  225 -6618 0
 6614  6615 -6616  225 -6619 0

c  0-1 --> -1
c    (-b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧ -p_225) -> ( b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0)
c  in CNF:
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨  b^{3, 76}_2
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_1
c     b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨  b^{3, 76}_0
c  in DIMACS:
 6614  6615  6616  225  6617 0
 6614  6615  6616  225 -6618 0
 6614  6615  6616  225  6619 0

c  -1-1 --> -2
c    ( b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧  b^{3, 75}_0 ∧ -p_225) -> ( b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0)
c  in CNF:
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨  b^{3, 76}_2
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨  b^{3, 76}_1
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨  p_225 ∨ -b^{3, 76}_0
c  in DIMACS:
-6614  6615 -6616  225  6617 0
-6614  6615 -6616  225  6618 0
-6614  6615 -6616  225 -6619 0

c  -2-1 --> break 
c    ( b^{3, 75}_2 ∧  b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨  b^{3, 75}_0 ∨  p_225 ∨ break
c  in DIMACS:
-6614 -6615  6616  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 75}_2 ∧ -b^{3, 75}_1 ∧ -b^{3, 75}_0 ∧ true) 
c  in CNF:
c    -b^{3, 75}_2 ∨  b^{3, 75}_1 ∨  b^{3, 75}_0 ∨ false 
c  in DIMACS:
-6614  6615  6616  0

c  3 does not represent an automaton state.
c    -(-b^{3, 75}_2 ∧  b^{3, 75}_1 ∧  b^{3, 75}_0 ∧ true) 
c  in CNF:
c     b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ false 
c  in DIMACS:
 6614 -6615 -6616  0
c  -3 does not represent an automaton state.
c    -( b^{3, 75}_2 ∧  b^{3, 75}_1 ∧  b^{3, 75}_0 ∧ true) 
c  in CNF:
c    -b^{3, 75}_2 ∨ -b^{3, 75}_1 ∨ -b^{3, 75}_0 ∨ false 
c  in DIMACS:
-6614 -6615 -6616  0

c i = 76
c  -2+1 --> -1
c    ( b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧  p_228) -> ( b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0)
c  in CNF:
c    -b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨  b^{3, 77}_2
c    -b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_1
c    -b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨  b^{3, 77}_0
c  in DIMACS:
-6617 -6618  6619 -228  6620 0
-6617 -6618  6619 -228 -6621 0
-6617 -6618  6619 -228  6622 0

c  -1+1 --> 0
c    ( b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0 ∧  p_228) -> (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧ -b^{3, 77}_0)
c  in CNF:
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_2
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_1
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_0
c  in DIMACS:
-6617  6618 -6619 -228 -6620 0
-6617  6618 -6619 -228 -6621 0
-6617  6618 -6619 -228 -6622 0

c  0+1 --> 1
c    (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧  p_228) -> (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0)
c  in CNF:
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_2
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_1
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨  b^{3, 77}_0
c  in DIMACS:
 6617  6618  6619 -228 -6620 0
 6617  6618  6619 -228 -6621 0
 6617  6618  6619 -228  6622 0

c  1+1 --> 2
c    (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0 ∧  p_228) -> (-b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0)
c  in CNF:
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_2
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨  b^{3, 77}_1
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ -p_228 ∨ -b^{3, 77}_0
c  in DIMACS:
 6617  6618 -6619 -228 -6620 0
 6617  6618 -6619 -228  6621 0
 6617  6618 -6619 -228 -6622 0

c  2+1 --> break 
c    (-b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧  p_228) -> break
c  in CNF:
c     b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 6617 -6618  6619 -228 1162 0


c  2-1 --> 1
c    (-b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧ -p_228) -> (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0)
c  in CNF:
c     b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_2
c     b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_1
c     b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨  b^{3, 77}_0
c  in DIMACS:
 6617 -6618  6619  228 -6620 0
 6617 -6618  6619  228 -6621 0
 6617 -6618  6619  228  6622 0

c  1-1 --> 0
c    (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0 ∧ -p_228) -> (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧ -b^{3, 77}_0)
c  in CNF:
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_2
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_1
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_0
c  in DIMACS:
 6617  6618 -6619  228 -6620 0
 6617  6618 -6619  228 -6621 0
 6617  6618 -6619  228 -6622 0

c  0-1 --> -1
c    (-b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧ -p_228) -> ( b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0)
c  in CNF:
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨  b^{3, 77}_2
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_1
c     b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨  b^{3, 77}_0
c  in DIMACS:
 6617  6618  6619  228  6620 0
 6617  6618  6619  228 -6621 0
 6617  6618  6619  228  6622 0

c  -1-1 --> -2
c    ( b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧  b^{3, 76}_0 ∧ -p_228) -> ( b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0)
c  in CNF:
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨  b^{3, 77}_2
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨  b^{3, 77}_1
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨  p_228 ∨ -b^{3, 77}_0
c  in DIMACS:
-6617  6618 -6619  228  6620 0
-6617  6618 -6619  228  6621 0
-6617  6618 -6619  228 -6622 0

c  -2-1 --> break 
c    ( b^{3, 76}_2 ∧  b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨  b^{3, 76}_0 ∨  p_228 ∨ break
c  in DIMACS:
-6617 -6618  6619  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 76}_2 ∧ -b^{3, 76}_1 ∧ -b^{3, 76}_0 ∧ true) 
c  in CNF:
c    -b^{3, 76}_2 ∨  b^{3, 76}_1 ∨  b^{3, 76}_0 ∨ false 
c  in DIMACS:
-6617  6618  6619  0

c  3 does not represent an automaton state.
c    -(-b^{3, 76}_2 ∧  b^{3, 76}_1 ∧  b^{3, 76}_0 ∧ true) 
c  in CNF:
c     b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ false 
c  in DIMACS:
 6617 -6618 -6619  0
c  -3 does not represent an automaton state.
c    -( b^{3, 76}_2 ∧  b^{3, 76}_1 ∧  b^{3, 76}_0 ∧ true) 
c  in CNF:
c    -b^{3, 76}_2 ∨ -b^{3, 76}_1 ∨ -b^{3, 76}_0 ∨ false 
c  in DIMACS:
-6617 -6618 -6619  0

c i = 77
c  -2+1 --> -1
c    ( b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧  p_231) -> ( b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0)
c  in CNF:
c    -b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨  b^{3, 78}_2
c    -b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_1
c    -b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨  b^{3, 78}_0
c  in DIMACS:
-6620 -6621  6622 -231  6623 0
-6620 -6621  6622 -231 -6624 0
-6620 -6621  6622 -231  6625 0

c  -1+1 --> 0
c    ( b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0 ∧  p_231) -> (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧ -b^{3, 78}_0)
c  in CNF:
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_2
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_1
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_0
c  in DIMACS:
-6620  6621 -6622 -231 -6623 0
-6620  6621 -6622 -231 -6624 0
-6620  6621 -6622 -231 -6625 0

c  0+1 --> 1
c    (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧  p_231) -> (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0)
c  in CNF:
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_2
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_1
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨  b^{3, 78}_0
c  in DIMACS:
 6620  6621  6622 -231 -6623 0
 6620  6621  6622 -231 -6624 0
 6620  6621  6622 -231  6625 0

c  1+1 --> 2
c    (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0 ∧  p_231) -> (-b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0)
c  in CNF:
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_2
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨  b^{3, 78}_1
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ -p_231 ∨ -b^{3, 78}_0
c  in DIMACS:
 6620  6621 -6622 -231 -6623 0
 6620  6621 -6622 -231  6624 0
 6620  6621 -6622 -231 -6625 0

c  2+1 --> break 
c    (-b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧  p_231) -> break
c  in CNF:
c     b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 6620 -6621  6622 -231 1162 0


c  2-1 --> 1
c    (-b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧ -p_231) -> (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0)
c  in CNF:
c     b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_2
c     b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_1
c     b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨  b^{3, 78}_0
c  in DIMACS:
 6620 -6621  6622  231 -6623 0
 6620 -6621  6622  231 -6624 0
 6620 -6621  6622  231  6625 0

c  1-1 --> 0
c    (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0 ∧ -p_231) -> (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧ -b^{3, 78}_0)
c  in CNF:
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_2
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_1
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_0
c  in DIMACS:
 6620  6621 -6622  231 -6623 0
 6620  6621 -6622  231 -6624 0
 6620  6621 -6622  231 -6625 0

c  0-1 --> -1
c    (-b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧ -p_231) -> ( b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0)
c  in CNF:
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨  b^{3, 78}_2
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_1
c     b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨  b^{3, 78}_0
c  in DIMACS:
 6620  6621  6622  231  6623 0
 6620  6621  6622  231 -6624 0
 6620  6621  6622  231  6625 0

c  -1-1 --> -2
c    ( b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧  b^{3, 77}_0 ∧ -p_231) -> ( b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0)
c  in CNF:
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨  b^{3, 78}_2
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨  b^{3, 78}_1
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨  p_231 ∨ -b^{3, 78}_0
c  in DIMACS:
-6620  6621 -6622  231  6623 0
-6620  6621 -6622  231  6624 0
-6620  6621 -6622  231 -6625 0

c  -2-1 --> break 
c    ( b^{3, 77}_2 ∧  b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨  b^{3, 77}_0 ∨  p_231 ∨ break
c  in DIMACS:
-6620 -6621  6622  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 77}_2 ∧ -b^{3, 77}_1 ∧ -b^{3, 77}_0 ∧ true) 
c  in CNF:
c    -b^{3, 77}_2 ∨  b^{3, 77}_1 ∨  b^{3, 77}_0 ∨ false 
c  in DIMACS:
-6620  6621  6622  0

c  3 does not represent an automaton state.
c    -(-b^{3, 77}_2 ∧  b^{3, 77}_1 ∧  b^{3, 77}_0 ∧ true) 
c  in CNF:
c     b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ false 
c  in DIMACS:
 6620 -6621 -6622  0
c  -3 does not represent an automaton state.
c    -( b^{3, 77}_2 ∧  b^{3, 77}_1 ∧  b^{3, 77}_0 ∧ true) 
c  in CNF:
c    -b^{3, 77}_2 ∨ -b^{3, 77}_1 ∨ -b^{3, 77}_0 ∨ false 
c  in DIMACS:
-6620 -6621 -6622  0

c i = 78
c  -2+1 --> -1
c    ( b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧  p_234) -> ( b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0)
c  in CNF:
c    -b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨  b^{3, 79}_2
c    -b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_1
c    -b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨  b^{3, 79}_0
c  in DIMACS:
-6623 -6624  6625 -234  6626 0
-6623 -6624  6625 -234 -6627 0
-6623 -6624  6625 -234  6628 0

c  -1+1 --> 0
c    ( b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0 ∧  p_234) -> (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧ -b^{3, 79}_0)
c  in CNF:
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_2
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_1
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_0
c  in DIMACS:
-6623  6624 -6625 -234 -6626 0
-6623  6624 -6625 -234 -6627 0
-6623  6624 -6625 -234 -6628 0

c  0+1 --> 1
c    (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧  p_234) -> (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0)
c  in CNF:
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_2
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_1
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨  b^{3, 79}_0
c  in DIMACS:
 6623  6624  6625 -234 -6626 0
 6623  6624  6625 -234 -6627 0
 6623  6624  6625 -234  6628 0

c  1+1 --> 2
c    (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0 ∧  p_234) -> (-b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0)
c  in CNF:
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_2
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨  b^{3, 79}_1
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ -p_234 ∨ -b^{3, 79}_0
c  in DIMACS:
 6623  6624 -6625 -234 -6626 0
 6623  6624 -6625 -234  6627 0
 6623  6624 -6625 -234 -6628 0

c  2+1 --> break 
c    (-b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧  p_234) -> break
c  in CNF:
c     b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 6623 -6624  6625 -234 1162 0


c  2-1 --> 1
c    (-b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧ -p_234) -> (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0)
c  in CNF:
c     b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_2
c     b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_1
c     b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨  b^{3, 79}_0
c  in DIMACS:
 6623 -6624  6625  234 -6626 0
 6623 -6624  6625  234 -6627 0
 6623 -6624  6625  234  6628 0

c  1-1 --> 0
c    (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0 ∧ -p_234) -> (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧ -b^{3, 79}_0)
c  in CNF:
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_2
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_1
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_0
c  in DIMACS:
 6623  6624 -6625  234 -6626 0
 6623  6624 -6625  234 -6627 0
 6623  6624 -6625  234 -6628 0

c  0-1 --> -1
c    (-b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧ -p_234) -> ( b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0)
c  in CNF:
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨  b^{3, 79}_2
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_1
c     b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨  b^{3, 79}_0
c  in DIMACS:
 6623  6624  6625  234  6626 0
 6623  6624  6625  234 -6627 0
 6623  6624  6625  234  6628 0

c  -1-1 --> -2
c    ( b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧  b^{3, 78}_0 ∧ -p_234) -> ( b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0)
c  in CNF:
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨  b^{3, 79}_2
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨  b^{3, 79}_1
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨  p_234 ∨ -b^{3, 79}_0
c  in DIMACS:
-6623  6624 -6625  234  6626 0
-6623  6624 -6625  234  6627 0
-6623  6624 -6625  234 -6628 0

c  -2-1 --> break 
c    ( b^{3, 78}_2 ∧  b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨  b^{3, 78}_0 ∨  p_234 ∨ break
c  in DIMACS:
-6623 -6624  6625  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 78}_2 ∧ -b^{3, 78}_1 ∧ -b^{3, 78}_0 ∧ true) 
c  in CNF:
c    -b^{3, 78}_2 ∨  b^{3, 78}_1 ∨  b^{3, 78}_0 ∨ false 
c  in DIMACS:
-6623  6624  6625  0

c  3 does not represent an automaton state.
c    -(-b^{3, 78}_2 ∧  b^{3, 78}_1 ∧  b^{3, 78}_0 ∧ true) 
c  in CNF:
c     b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ false 
c  in DIMACS:
 6623 -6624 -6625  0
c  -3 does not represent an automaton state.
c    -( b^{3, 78}_2 ∧  b^{3, 78}_1 ∧  b^{3, 78}_0 ∧ true) 
c  in CNF:
c    -b^{3, 78}_2 ∨ -b^{3, 78}_1 ∨ -b^{3, 78}_0 ∨ false 
c  in DIMACS:
-6623 -6624 -6625  0

c i = 79
c  -2+1 --> -1
c    ( b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧  p_237) -> ( b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0)
c  in CNF:
c    -b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨  b^{3, 80}_2
c    -b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_1
c    -b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨  b^{3, 80}_0
c  in DIMACS:
-6626 -6627  6628 -237  6629 0
-6626 -6627  6628 -237 -6630 0
-6626 -6627  6628 -237  6631 0

c  -1+1 --> 0
c    ( b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0 ∧  p_237) -> (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧ -b^{3, 80}_0)
c  in CNF:
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_2
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_1
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_0
c  in DIMACS:
-6626  6627 -6628 -237 -6629 0
-6626  6627 -6628 -237 -6630 0
-6626  6627 -6628 -237 -6631 0

c  0+1 --> 1
c    (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧  p_237) -> (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0)
c  in CNF:
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_2
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_1
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨  b^{3, 80}_0
c  in DIMACS:
 6626  6627  6628 -237 -6629 0
 6626  6627  6628 -237 -6630 0
 6626  6627  6628 -237  6631 0

c  1+1 --> 2
c    (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0 ∧  p_237) -> (-b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0)
c  in CNF:
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_2
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨  b^{3, 80}_1
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ -p_237 ∨ -b^{3, 80}_0
c  in DIMACS:
 6626  6627 -6628 -237 -6629 0
 6626  6627 -6628 -237  6630 0
 6626  6627 -6628 -237 -6631 0

c  2+1 --> break 
c    (-b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧  p_237) -> break
c  in CNF:
c     b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ -p_237 ∨ break
c  in DIMACS:
 6626 -6627  6628 -237 1162 0


c  2-1 --> 1
c    (-b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧ -p_237) -> (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0)
c  in CNF:
c     b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_2
c     b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_1
c     b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨  b^{3, 80}_0
c  in DIMACS:
 6626 -6627  6628  237 -6629 0
 6626 -6627  6628  237 -6630 0
 6626 -6627  6628  237  6631 0

c  1-1 --> 0
c    (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0 ∧ -p_237) -> (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧ -b^{3, 80}_0)
c  in CNF:
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_2
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_1
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_0
c  in DIMACS:
 6626  6627 -6628  237 -6629 0
 6626  6627 -6628  237 -6630 0
 6626  6627 -6628  237 -6631 0

c  0-1 --> -1
c    (-b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧ -p_237) -> ( b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0)
c  in CNF:
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨  b^{3, 80}_2
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_1
c     b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨  b^{3, 80}_0
c  in DIMACS:
 6626  6627  6628  237  6629 0
 6626  6627  6628  237 -6630 0
 6626  6627  6628  237  6631 0

c  -1-1 --> -2
c    ( b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧  b^{3, 79}_0 ∧ -p_237) -> ( b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0)
c  in CNF:
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨  b^{3, 80}_2
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨  b^{3, 80}_1
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨  p_237 ∨ -b^{3, 80}_0
c  in DIMACS:
-6626  6627 -6628  237  6629 0
-6626  6627 -6628  237  6630 0
-6626  6627 -6628  237 -6631 0

c  -2-1 --> break 
c    ( b^{3, 79}_2 ∧  b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧ -p_237) -> break
c  in CNF:
c    -b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨  b^{3, 79}_0 ∨  p_237 ∨ break
c  in DIMACS:
-6626 -6627  6628  237 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 79}_2 ∧ -b^{3, 79}_1 ∧ -b^{3, 79}_0 ∧ true) 
c  in CNF:
c    -b^{3, 79}_2 ∨  b^{3, 79}_1 ∨  b^{3, 79}_0 ∨ false 
c  in DIMACS:
-6626  6627  6628  0

c  3 does not represent an automaton state.
c    -(-b^{3, 79}_2 ∧  b^{3, 79}_1 ∧  b^{3, 79}_0 ∧ true) 
c  in CNF:
c     b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ false 
c  in DIMACS:
 6626 -6627 -6628  0
c  -3 does not represent an automaton state.
c    -( b^{3, 79}_2 ∧  b^{3, 79}_1 ∧  b^{3, 79}_0 ∧ true) 
c  in CNF:
c    -b^{3, 79}_2 ∨ -b^{3, 79}_1 ∨ -b^{3, 79}_0 ∨ false 
c  in DIMACS:
-6626 -6627 -6628  0

c i = 80
c  -2+1 --> -1
c    ( b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧  p_240) -> ( b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0)
c  in CNF:
c    -b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨  b^{3, 81}_2
c    -b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_1
c    -b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨  b^{3, 81}_0
c  in DIMACS:
-6629 -6630  6631 -240  6632 0
-6629 -6630  6631 -240 -6633 0
-6629 -6630  6631 -240  6634 0

c  -1+1 --> 0
c    ( b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0 ∧  p_240) -> (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧ -b^{3, 81}_0)
c  in CNF:
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_2
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_1
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_0
c  in DIMACS:
-6629  6630 -6631 -240 -6632 0
-6629  6630 -6631 -240 -6633 0
-6629  6630 -6631 -240 -6634 0

c  0+1 --> 1
c    (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧  p_240) -> (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0)
c  in CNF:
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_2
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_1
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨  b^{3, 81}_0
c  in DIMACS:
 6629  6630  6631 -240 -6632 0
 6629  6630  6631 -240 -6633 0
 6629  6630  6631 -240  6634 0

c  1+1 --> 2
c    (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0 ∧  p_240) -> (-b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0)
c  in CNF:
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_2
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨  b^{3, 81}_1
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ -p_240 ∨ -b^{3, 81}_0
c  in DIMACS:
 6629  6630 -6631 -240 -6632 0
 6629  6630 -6631 -240  6633 0
 6629  6630 -6631 -240 -6634 0

c  2+1 --> break 
c    (-b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧  p_240) -> break
c  in CNF:
c     b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 6629 -6630  6631 -240 1162 0


c  2-1 --> 1
c    (-b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧ -p_240) -> (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0)
c  in CNF:
c     b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_2
c     b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_1
c     b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨  b^{3, 81}_0
c  in DIMACS:
 6629 -6630  6631  240 -6632 0
 6629 -6630  6631  240 -6633 0
 6629 -6630  6631  240  6634 0

c  1-1 --> 0
c    (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0 ∧ -p_240) -> (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧ -b^{3, 81}_0)
c  in CNF:
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_2
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_1
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_0
c  in DIMACS:
 6629  6630 -6631  240 -6632 0
 6629  6630 -6631  240 -6633 0
 6629  6630 -6631  240 -6634 0

c  0-1 --> -1
c    (-b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧ -p_240) -> ( b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0)
c  in CNF:
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨  b^{3, 81}_2
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_1
c     b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨  b^{3, 81}_0
c  in DIMACS:
 6629  6630  6631  240  6632 0
 6629  6630  6631  240 -6633 0
 6629  6630  6631  240  6634 0

c  -1-1 --> -2
c    ( b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧  b^{3, 80}_0 ∧ -p_240) -> ( b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0)
c  in CNF:
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨  b^{3, 81}_2
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨  b^{3, 81}_1
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨  p_240 ∨ -b^{3, 81}_0
c  in DIMACS:
-6629  6630 -6631  240  6632 0
-6629  6630 -6631  240  6633 0
-6629  6630 -6631  240 -6634 0

c  -2-1 --> break 
c    ( b^{3, 80}_2 ∧  b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨  b^{3, 80}_0 ∨  p_240 ∨ break
c  in DIMACS:
-6629 -6630  6631  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 80}_2 ∧ -b^{3, 80}_1 ∧ -b^{3, 80}_0 ∧ true) 
c  in CNF:
c    -b^{3, 80}_2 ∨  b^{3, 80}_1 ∨  b^{3, 80}_0 ∨ false 
c  in DIMACS:
-6629  6630  6631  0

c  3 does not represent an automaton state.
c    -(-b^{3, 80}_2 ∧  b^{3, 80}_1 ∧  b^{3, 80}_0 ∧ true) 
c  in CNF:
c     b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ false 
c  in DIMACS:
 6629 -6630 -6631  0
c  -3 does not represent an automaton state.
c    -( b^{3, 80}_2 ∧  b^{3, 80}_1 ∧  b^{3, 80}_0 ∧ true) 
c  in CNF:
c    -b^{3, 80}_2 ∨ -b^{3, 80}_1 ∨ -b^{3, 80}_0 ∨ false 
c  in DIMACS:
-6629 -6630 -6631  0

c i = 81
c  -2+1 --> -1
c    ( b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧  p_243) -> ( b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0)
c  in CNF:
c    -b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨  b^{3, 82}_2
c    -b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_1
c    -b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨  b^{3, 82}_0
c  in DIMACS:
-6632 -6633  6634 -243  6635 0
-6632 -6633  6634 -243 -6636 0
-6632 -6633  6634 -243  6637 0

c  -1+1 --> 0
c    ( b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0 ∧  p_243) -> (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧ -b^{3, 82}_0)
c  in CNF:
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_2
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_1
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_0
c  in DIMACS:
-6632  6633 -6634 -243 -6635 0
-6632  6633 -6634 -243 -6636 0
-6632  6633 -6634 -243 -6637 0

c  0+1 --> 1
c    (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧  p_243) -> (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0)
c  in CNF:
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_2
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_1
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨  b^{3, 82}_0
c  in DIMACS:
 6632  6633  6634 -243 -6635 0
 6632  6633  6634 -243 -6636 0
 6632  6633  6634 -243  6637 0

c  1+1 --> 2
c    (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0 ∧  p_243) -> (-b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0)
c  in CNF:
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_2
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨  b^{3, 82}_1
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ -p_243 ∨ -b^{3, 82}_0
c  in DIMACS:
 6632  6633 -6634 -243 -6635 0
 6632  6633 -6634 -243  6636 0
 6632  6633 -6634 -243 -6637 0

c  2+1 --> break 
c    (-b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧  p_243) -> break
c  in CNF:
c     b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 6632 -6633  6634 -243 1162 0


c  2-1 --> 1
c    (-b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧ -p_243) -> (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0)
c  in CNF:
c     b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_2
c     b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_1
c     b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨  b^{3, 82}_0
c  in DIMACS:
 6632 -6633  6634  243 -6635 0
 6632 -6633  6634  243 -6636 0
 6632 -6633  6634  243  6637 0

c  1-1 --> 0
c    (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0 ∧ -p_243) -> (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧ -b^{3, 82}_0)
c  in CNF:
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_2
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_1
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_0
c  in DIMACS:
 6632  6633 -6634  243 -6635 0
 6632  6633 -6634  243 -6636 0
 6632  6633 -6634  243 -6637 0

c  0-1 --> -1
c    (-b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧ -p_243) -> ( b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0)
c  in CNF:
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨  b^{3, 82}_2
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_1
c     b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨  b^{3, 82}_0
c  in DIMACS:
 6632  6633  6634  243  6635 0
 6632  6633  6634  243 -6636 0
 6632  6633  6634  243  6637 0

c  -1-1 --> -2
c    ( b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧  b^{3, 81}_0 ∧ -p_243) -> ( b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0)
c  in CNF:
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨  b^{3, 82}_2
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨  b^{3, 82}_1
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨  p_243 ∨ -b^{3, 82}_0
c  in DIMACS:
-6632  6633 -6634  243  6635 0
-6632  6633 -6634  243  6636 0
-6632  6633 -6634  243 -6637 0

c  -2-1 --> break 
c    ( b^{3, 81}_2 ∧  b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨  b^{3, 81}_0 ∨  p_243 ∨ break
c  in DIMACS:
-6632 -6633  6634  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 81}_2 ∧ -b^{3, 81}_1 ∧ -b^{3, 81}_0 ∧ true) 
c  in CNF:
c    -b^{3, 81}_2 ∨  b^{3, 81}_1 ∨  b^{3, 81}_0 ∨ false 
c  in DIMACS:
-6632  6633  6634  0

c  3 does not represent an automaton state.
c    -(-b^{3, 81}_2 ∧  b^{3, 81}_1 ∧  b^{3, 81}_0 ∧ true) 
c  in CNF:
c     b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ false 
c  in DIMACS:
 6632 -6633 -6634  0
c  -3 does not represent an automaton state.
c    -( b^{3, 81}_2 ∧  b^{3, 81}_1 ∧  b^{3, 81}_0 ∧ true) 
c  in CNF:
c    -b^{3, 81}_2 ∨ -b^{3, 81}_1 ∨ -b^{3, 81}_0 ∨ false 
c  in DIMACS:
-6632 -6633 -6634  0

c i = 82
c  -2+1 --> -1
c    ( b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧  p_246) -> ( b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0)
c  in CNF:
c    -b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨  b^{3, 83}_2
c    -b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_1
c    -b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨  b^{3, 83}_0
c  in DIMACS:
-6635 -6636  6637 -246  6638 0
-6635 -6636  6637 -246 -6639 0
-6635 -6636  6637 -246  6640 0

c  -1+1 --> 0
c    ( b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0 ∧  p_246) -> (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧ -b^{3, 83}_0)
c  in CNF:
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_2
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_1
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_0
c  in DIMACS:
-6635  6636 -6637 -246 -6638 0
-6635  6636 -6637 -246 -6639 0
-6635  6636 -6637 -246 -6640 0

c  0+1 --> 1
c    (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧  p_246) -> (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0)
c  in CNF:
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_2
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_1
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨  b^{3, 83}_0
c  in DIMACS:
 6635  6636  6637 -246 -6638 0
 6635  6636  6637 -246 -6639 0
 6635  6636  6637 -246  6640 0

c  1+1 --> 2
c    (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0 ∧  p_246) -> (-b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0)
c  in CNF:
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_2
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨  b^{3, 83}_1
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ -p_246 ∨ -b^{3, 83}_0
c  in DIMACS:
 6635  6636 -6637 -246 -6638 0
 6635  6636 -6637 -246  6639 0
 6635  6636 -6637 -246 -6640 0

c  2+1 --> break 
c    (-b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧  p_246) -> break
c  in CNF:
c     b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 6635 -6636  6637 -246 1162 0


c  2-1 --> 1
c    (-b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧ -p_246) -> (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0)
c  in CNF:
c     b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_2
c     b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_1
c     b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨  b^{3, 83}_0
c  in DIMACS:
 6635 -6636  6637  246 -6638 0
 6635 -6636  6637  246 -6639 0
 6635 -6636  6637  246  6640 0

c  1-1 --> 0
c    (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0 ∧ -p_246) -> (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧ -b^{3, 83}_0)
c  in CNF:
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_2
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_1
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_0
c  in DIMACS:
 6635  6636 -6637  246 -6638 0
 6635  6636 -6637  246 -6639 0
 6635  6636 -6637  246 -6640 0

c  0-1 --> -1
c    (-b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧ -p_246) -> ( b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0)
c  in CNF:
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨  b^{3, 83}_2
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_1
c     b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨  b^{3, 83}_0
c  in DIMACS:
 6635  6636  6637  246  6638 0
 6635  6636  6637  246 -6639 0
 6635  6636  6637  246  6640 0

c  -1-1 --> -2
c    ( b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧  b^{3, 82}_0 ∧ -p_246) -> ( b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0)
c  in CNF:
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨  b^{3, 83}_2
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨  b^{3, 83}_1
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨  p_246 ∨ -b^{3, 83}_0
c  in DIMACS:
-6635  6636 -6637  246  6638 0
-6635  6636 -6637  246  6639 0
-6635  6636 -6637  246 -6640 0

c  -2-1 --> break 
c    ( b^{3, 82}_2 ∧  b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨  b^{3, 82}_0 ∨  p_246 ∨ break
c  in DIMACS:
-6635 -6636  6637  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 82}_2 ∧ -b^{3, 82}_1 ∧ -b^{3, 82}_0 ∧ true) 
c  in CNF:
c    -b^{3, 82}_2 ∨  b^{3, 82}_1 ∨  b^{3, 82}_0 ∨ false 
c  in DIMACS:
-6635  6636  6637  0

c  3 does not represent an automaton state.
c    -(-b^{3, 82}_2 ∧  b^{3, 82}_1 ∧  b^{3, 82}_0 ∧ true) 
c  in CNF:
c     b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ false 
c  in DIMACS:
 6635 -6636 -6637  0
c  -3 does not represent an automaton state.
c    -( b^{3, 82}_2 ∧  b^{3, 82}_1 ∧  b^{3, 82}_0 ∧ true) 
c  in CNF:
c    -b^{3, 82}_2 ∨ -b^{3, 82}_1 ∨ -b^{3, 82}_0 ∨ false 
c  in DIMACS:
-6635 -6636 -6637  0

c i = 83
c  -2+1 --> -1
c    ( b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧  p_249) -> ( b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0)
c  in CNF:
c    -b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨  b^{3, 84}_2
c    -b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_1
c    -b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨  b^{3, 84}_0
c  in DIMACS:
-6638 -6639  6640 -249  6641 0
-6638 -6639  6640 -249 -6642 0
-6638 -6639  6640 -249  6643 0

c  -1+1 --> 0
c    ( b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0 ∧  p_249) -> (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧ -b^{3, 84}_0)
c  in CNF:
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_2
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_1
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_0
c  in DIMACS:
-6638  6639 -6640 -249 -6641 0
-6638  6639 -6640 -249 -6642 0
-6638  6639 -6640 -249 -6643 0

c  0+1 --> 1
c    (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧  p_249) -> (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0)
c  in CNF:
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_2
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_1
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨  b^{3, 84}_0
c  in DIMACS:
 6638  6639  6640 -249 -6641 0
 6638  6639  6640 -249 -6642 0
 6638  6639  6640 -249  6643 0

c  1+1 --> 2
c    (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0 ∧  p_249) -> (-b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0)
c  in CNF:
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_2
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨  b^{3, 84}_1
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ -p_249 ∨ -b^{3, 84}_0
c  in DIMACS:
 6638  6639 -6640 -249 -6641 0
 6638  6639 -6640 -249  6642 0
 6638  6639 -6640 -249 -6643 0

c  2+1 --> break 
c    (-b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧  p_249) -> break
c  in CNF:
c     b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ -p_249 ∨ break
c  in DIMACS:
 6638 -6639  6640 -249 1162 0


c  2-1 --> 1
c    (-b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧ -p_249) -> (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0)
c  in CNF:
c     b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_2
c     b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_1
c     b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨  b^{3, 84}_0
c  in DIMACS:
 6638 -6639  6640  249 -6641 0
 6638 -6639  6640  249 -6642 0
 6638 -6639  6640  249  6643 0

c  1-1 --> 0
c    (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0 ∧ -p_249) -> (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧ -b^{3, 84}_0)
c  in CNF:
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_2
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_1
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_0
c  in DIMACS:
 6638  6639 -6640  249 -6641 0
 6638  6639 -6640  249 -6642 0
 6638  6639 -6640  249 -6643 0

c  0-1 --> -1
c    (-b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧ -p_249) -> ( b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0)
c  in CNF:
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨  b^{3, 84}_2
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_1
c     b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨  b^{3, 84}_0
c  in DIMACS:
 6638  6639  6640  249  6641 0
 6638  6639  6640  249 -6642 0
 6638  6639  6640  249  6643 0

c  -1-1 --> -2
c    ( b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧  b^{3, 83}_0 ∧ -p_249) -> ( b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0)
c  in CNF:
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨  b^{3, 84}_2
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨  b^{3, 84}_1
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨  p_249 ∨ -b^{3, 84}_0
c  in DIMACS:
-6638  6639 -6640  249  6641 0
-6638  6639 -6640  249  6642 0
-6638  6639 -6640  249 -6643 0

c  -2-1 --> break 
c    ( b^{3, 83}_2 ∧  b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧ -p_249) -> break
c  in CNF:
c    -b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨  b^{3, 83}_0 ∨  p_249 ∨ break
c  in DIMACS:
-6638 -6639  6640  249 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 83}_2 ∧ -b^{3, 83}_1 ∧ -b^{3, 83}_0 ∧ true) 
c  in CNF:
c    -b^{3, 83}_2 ∨  b^{3, 83}_1 ∨  b^{3, 83}_0 ∨ false 
c  in DIMACS:
-6638  6639  6640  0

c  3 does not represent an automaton state.
c    -(-b^{3, 83}_2 ∧  b^{3, 83}_1 ∧  b^{3, 83}_0 ∧ true) 
c  in CNF:
c     b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ false 
c  in DIMACS:
 6638 -6639 -6640  0
c  -3 does not represent an automaton state.
c    -( b^{3, 83}_2 ∧  b^{3, 83}_1 ∧  b^{3, 83}_0 ∧ true) 
c  in CNF:
c    -b^{3, 83}_2 ∨ -b^{3, 83}_1 ∨ -b^{3, 83}_0 ∨ false 
c  in DIMACS:
-6638 -6639 -6640  0

c i = 84
c  -2+1 --> -1
c    ( b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧  p_252) -> ( b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0)
c  in CNF:
c    -b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨  b^{3, 85}_2
c    -b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_1
c    -b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨  b^{3, 85}_0
c  in DIMACS:
-6641 -6642  6643 -252  6644 0
-6641 -6642  6643 -252 -6645 0
-6641 -6642  6643 -252  6646 0

c  -1+1 --> 0
c    ( b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0 ∧  p_252) -> (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧ -b^{3, 85}_0)
c  in CNF:
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_2
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_1
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_0
c  in DIMACS:
-6641  6642 -6643 -252 -6644 0
-6641  6642 -6643 -252 -6645 0
-6641  6642 -6643 -252 -6646 0

c  0+1 --> 1
c    (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧  p_252) -> (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0)
c  in CNF:
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_2
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_1
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨  b^{3, 85}_0
c  in DIMACS:
 6641  6642  6643 -252 -6644 0
 6641  6642  6643 -252 -6645 0
 6641  6642  6643 -252  6646 0

c  1+1 --> 2
c    (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0 ∧  p_252) -> (-b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0)
c  in CNF:
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_2
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨  b^{3, 85}_1
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ -p_252 ∨ -b^{3, 85}_0
c  in DIMACS:
 6641  6642 -6643 -252 -6644 0
 6641  6642 -6643 -252  6645 0
 6641  6642 -6643 -252 -6646 0

c  2+1 --> break 
c    (-b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧  p_252) -> break
c  in CNF:
c     b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 6641 -6642  6643 -252 1162 0


c  2-1 --> 1
c    (-b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧ -p_252) -> (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0)
c  in CNF:
c     b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_2
c     b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_1
c     b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨  b^{3, 85}_0
c  in DIMACS:
 6641 -6642  6643  252 -6644 0
 6641 -6642  6643  252 -6645 0
 6641 -6642  6643  252  6646 0

c  1-1 --> 0
c    (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0 ∧ -p_252) -> (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧ -b^{3, 85}_0)
c  in CNF:
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_2
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_1
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_0
c  in DIMACS:
 6641  6642 -6643  252 -6644 0
 6641  6642 -6643  252 -6645 0
 6641  6642 -6643  252 -6646 0

c  0-1 --> -1
c    (-b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧ -p_252) -> ( b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0)
c  in CNF:
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨  b^{3, 85}_2
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_1
c     b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨  b^{3, 85}_0
c  in DIMACS:
 6641  6642  6643  252  6644 0
 6641  6642  6643  252 -6645 0
 6641  6642  6643  252  6646 0

c  -1-1 --> -2
c    ( b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧  b^{3, 84}_0 ∧ -p_252) -> ( b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0)
c  in CNF:
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨  b^{3, 85}_2
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨  b^{3, 85}_1
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨  p_252 ∨ -b^{3, 85}_0
c  in DIMACS:
-6641  6642 -6643  252  6644 0
-6641  6642 -6643  252  6645 0
-6641  6642 -6643  252 -6646 0

c  -2-1 --> break 
c    ( b^{3, 84}_2 ∧  b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨  b^{3, 84}_0 ∨  p_252 ∨ break
c  in DIMACS:
-6641 -6642  6643  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 84}_2 ∧ -b^{3, 84}_1 ∧ -b^{3, 84}_0 ∧ true) 
c  in CNF:
c    -b^{3, 84}_2 ∨  b^{3, 84}_1 ∨  b^{3, 84}_0 ∨ false 
c  in DIMACS:
-6641  6642  6643  0

c  3 does not represent an automaton state.
c    -(-b^{3, 84}_2 ∧  b^{3, 84}_1 ∧  b^{3, 84}_0 ∧ true) 
c  in CNF:
c     b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ false 
c  in DIMACS:
 6641 -6642 -6643  0
c  -3 does not represent an automaton state.
c    -( b^{3, 84}_2 ∧  b^{3, 84}_1 ∧  b^{3, 84}_0 ∧ true) 
c  in CNF:
c    -b^{3, 84}_2 ∨ -b^{3, 84}_1 ∨ -b^{3, 84}_0 ∨ false 
c  in DIMACS:
-6641 -6642 -6643  0

c i = 85
c  -2+1 --> -1
c    ( b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧  p_255) -> ( b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0)
c  in CNF:
c    -b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨  b^{3, 86}_2
c    -b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_1
c    -b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨  b^{3, 86}_0
c  in DIMACS:
-6644 -6645  6646 -255  6647 0
-6644 -6645  6646 -255 -6648 0
-6644 -6645  6646 -255  6649 0

c  -1+1 --> 0
c    ( b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0 ∧  p_255) -> (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧ -b^{3, 86}_0)
c  in CNF:
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_2
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_1
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_0
c  in DIMACS:
-6644  6645 -6646 -255 -6647 0
-6644  6645 -6646 -255 -6648 0
-6644  6645 -6646 -255 -6649 0

c  0+1 --> 1
c    (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧  p_255) -> (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0)
c  in CNF:
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_2
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_1
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨  b^{3, 86}_0
c  in DIMACS:
 6644  6645  6646 -255 -6647 0
 6644  6645  6646 -255 -6648 0
 6644  6645  6646 -255  6649 0

c  1+1 --> 2
c    (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0 ∧  p_255) -> (-b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0)
c  in CNF:
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_2
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨  b^{3, 86}_1
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ -p_255 ∨ -b^{3, 86}_0
c  in DIMACS:
 6644  6645 -6646 -255 -6647 0
 6644  6645 -6646 -255  6648 0
 6644  6645 -6646 -255 -6649 0

c  2+1 --> break 
c    (-b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧  p_255) -> break
c  in CNF:
c     b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 6644 -6645  6646 -255 1162 0


c  2-1 --> 1
c    (-b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧ -p_255) -> (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0)
c  in CNF:
c     b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_2
c     b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_1
c     b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨  b^{3, 86}_0
c  in DIMACS:
 6644 -6645  6646  255 -6647 0
 6644 -6645  6646  255 -6648 0
 6644 -6645  6646  255  6649 0

c  1-1 --> 0
c    (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0 ∧ -p_255) -> (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧ -b^{3, 86}_0)
c  in CNF:
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_2
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_1
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_0
c  in DIMACS:
 6644  6645 -6646  255 -6647 0
 6644  6645 -6646  255 -6648 0
 6644  6645 -6646  255 -6649 0

c  0-1 --> -1
c    (-b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧ -p_255) -> ( b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0)
c  in CNF:
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨  b^{3, 86}_2
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_1
c     b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨  b^{3, 86}_0
c  in DIMACS:
 6644  6645  6646  255  6647 0
 6644  6645  6646  255 -6648 0
 6644  6645  6646  255  6649 0

c  -1-1 --> -2
c    ( b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧  b^{3, 85}_0 ∧ -p_255) -> ( b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0)
c  in CNF:
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨  b^{3, 86}_2
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨  b^{3, 86}_1
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨  p_255 ∨ -b^{3, 86}_0
c  in DIMACS:
-6644  6645 -6646  255  6647 0
-6644  6645 -6646  255  6648 0
-6644  6645 -6646  255 -6649 0

c  -2-1 --> break 
c    ( b^{3, 85}_2 ∧  b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨  b^{3, 85}_0 ∨  p_255 ∨ break
c  in DIMACS:
-6644 -6645  6646  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 85}_2 ∧ -b^{3, 85}_1 ∧ -b^{3, 85}_0 ∧ true) 
c  in CNF:
c    -b^{3, 85}_2 ∨  b^{3, 85}_1 ∨  b^{3, 85}_0 ∨ false 
c  in DIMACS:
-6644  6645  6646  0

c  3 does not represent an automaton state.
c    -(-b^{3, 85}_2 ∧  b^{3, 85}_1 ∧  b^{3, 85}_0 ∧ true) 
c  in CNF:
c     b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ false 
c  in DIMACS:
 6644 -6645 -6646  0
c  -3 does not represent an automaton state.
c    -( b^{3, 85}_2 ∧  b^{3, 85}_1 ∧  b^{3, 85}_0 ∧ true) 
c  in CNF:
c    -b^{3, 85}_2 ∨ -b^{3, 85}_1 ∨ -b^{3, 85}_0 ∨ false 
c  in DIMACS:
-6644 -6645 -6646  0

c i = 86
c  -2+1 --> -1
c    ( b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧  p_258) -> ( b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0)
c  in CNF:
c    -b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨  b^{3, 87}_2
c    -b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_1
c    -b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨  b^{3, 87}_0
c  in DIMACS:
-6647 -6648  6649 -258  6650 0
-6647 -6648  6649 -258 -6651 0
-6647 -6648  6649 -258  6652 0

c  -1+1 --> 0
c    ( b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0 ∧  p_258) -> (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧ -b^{3, 87}_0)
c  in CNF:
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_2
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_1
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_0
c  in DIMACS:
-6647  6648 -6649 -258 -6650 0
-6647  6648 -6649 -258 -6651 0
-6647  6648 -6649 -258 -6652 0

c  0+1 --> 1
c    (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧  p_258) -> (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0)
c  in CNF:
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_2
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_1
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨  b^{3, 87}_0
c  in DIMACS:
 6647  6648  6649 -258 -6650 0
 6647  6648  6649 -258 -6651 0
 6647  6648  6649 -258  6652 0

c  1+1 --> 2
c    (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0 ∧  p_258) -> (-b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0)
c  in CNF:
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_2
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨  b^{3, 87}_1
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ -p_258 ∨ -b^{3, 87}_0
c  in DIMACS:
 6647  6648 -6649 -258 -6650 0
 6647  6648 -6649 -258  6651 0
 6647  6648 -6649 -258 -6652 0

c  2+1 --> break 
c    (-b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧  p_258) -> break
c  in CNF:
c     b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 6647 -6648  6649 -258 1162 0


c  2-1 --> 1
c    (-b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧ -p_258) -> (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0)
c  in CNF:
c     b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_2
c     b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_1
c     b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨  b^{3, 87}_0
c  in DIMACS:
 6647 -6648  6649  258 -6650 0
 6647 -6648  6649  258 -6651 0
 6647 -6648  6649  258  6652 0

c  1-1 --> 0
c    (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0 ∧ -p_258) -> (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧ -b^{3, 87}_0)
c  in CNF:
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_2
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_1
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_0
c  in DIMACS:
 6647  6648 -6649  258 -6650 0
 6647  6648 -6649  258 -6651 0
 6647  6648 -6649  258 -6652 0

c  0-1 --> -1
c    (-b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧ -p_258) -> ( b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0)
c  in CNF:
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨  b^{3, 87}_2
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_1
c     b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨  b^{3, 87}_0
c  in DIMACS:
 6647  6648  6649  258  6650 0
 6647  6648  6649  258 -6651 0
 6647  6648  6649  258  6652 0

c  -1-1 --> -2
c    ( b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧  b^{3, 86}_0 ∧ -p_258) -> ( b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0)
c  in CNF:
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨  b^{3, 87}_2
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨  b^{3, 87}_1
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨  p_258 ∨ -b^{3, 87}_0
c  in DIMACS:
-6647  6648 -6649  258  6650 0
-6647  6648 -6649  258  6651 0
-6647  6648 -6649  258 -6652 0

c  -2-1 --> break 
c    ( b^{3, 86}_2 ∧  b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨  b^{3, 86}_0 ∨  p_258 ∨ break
c  in DIMACS:
-6647 -6648  6649  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 86}_2 ∧ -b^{3, 86}_1 ∧ -b^{3, 86}_0 ∧ true) 
c  in CNF:
c    -b^{3, 86}_2 ∨  b^{3, 86}_1 ∨  b^{3, 86}_0 ∨ false 
c  in DIMACS:
-6647  6648  6649  0

c  3 does not represent an automaton state.
c    -(-b^{3, 86}_2 ∧  b^{3, 86}_1 ∧  b^{3, 86}_0 ∧ true) 
c  in CNF:
c     b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ false 
c  in DIMACS:
 6647 -6648 -6649  0
c  -3 does not represent an automaton state.
c    -( b^{3, 86}_2 ∧  b^{3, 86}_1 ∧  b^{3, 86}_0 ∧ true) 
c  in CNF:
c    -b^{3, 86}_2 ∨ -b^{3, 86}_1 ∨ -b^{3, 86}_0 ∨ false 
c  in DIMACS:
-6647 -6648 -6649  0

c i = 87
c  -2+1 --> -1
c    ( b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧  p_261) -> ( b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0)
c  in CNF:
c    -b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨  b^{3, 88}_2
c    -b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_1
c    -b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨  b^{3, 88}_0
c  in DIMACS:
-6650 -6651  6652 -261  6653 0
-6650 -6651  6652 -261 -6654 0
-6650 -6651  6652 -261  6655 0

c  -1+1 --> 0
c    ( b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0 ∧  p_261) -> (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧ -b^{3, 88}_0)
c  in CNF:
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_2
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_1
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_0
c  in DIMACS:
-6650  6651 -6652 -261 -6653 0
-6650  6651 -6652 -261 -6654 0
-6650  6651 -6652 -261 -6655 0

c  0+1 --> 1
c    (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧  p_261) -> (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0)
c  in CNF:
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_2
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_1
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨  b^{3, 88}_0
c  in DIMACS:
 6650  6651  6652 -261 -6653 0
 6650  6651  6652 -261 -6654 0
 6650  6651  6652 -261  6655 0

c  1+1 --> 2
c    (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0 ∧  p_261) -> (-b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0)
c  in CNF:
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_2
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨  b^{3, 88}_1
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ -p_261 ∨ -b^{3, 88}_0
c  in DIMACS:
 6650  6651 -6652 -261 -6653 0
 6650  6651 -6652 -261  6654 0
 6650  6651 -6652 -261 -6655 0

c  2+1 --> break 
c    (-b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧  p_261) -> break
c  in CNF:
c     b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 6650 -6651  6652 -261 1162 0


c  2-1 --> 1
c    (-b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧ -p_261) -> (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0)
c  in CNF:
c     b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_2
c     b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_1
c     b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨  b^{3, 88}_0
c  in DIMACS:
 6650 -6651  6652  261 -6653 0
 6650 -6651  6652  261 -6654 0
 6650 -6651  6652  261  6655 0

c  1-1 --> 0
c    (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0 ∧ -p_261) -> (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧ -b^{3, 88}_0)
c  in CNF:
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_2
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_1
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_0
c  in DIMACS:
 6650  6651 -6652  261 -6653 0
 6650  6651 -6652  261 -6654 0
 6650  6651 -6652  261 -6655 0

c  0-1 --> -1
c    (-b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧ -p_261) -> ( b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0)
c  in CNF:
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨  b^{3, 88}_2
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_1
c     b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨  b^{3, 88}_0
c  in DIMACS:
 6650  6651  6652  261  6653 0
 6650  6651  6652  261 -6654 0
 6650  6651  6652  261  6655 0

c  -1-1 --> -2
c    ( b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧  b^{3, 87}_0 ∧ -p_261) -> ( b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0)
c  in CNF:
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨  b^{3, 88}_2
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨  b^{3, 88}_1
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨  p_261 ∨ -b^{3, 88}_0
c  in DIMACS:
-6650  6651 -6652  261  6653 0
-6650  6651 -6652  261  6654 0
-6650  6651 -6652  261 -6655 0

c  -2-1 --> break 
c    ( b^{3, 87}_2 ∧  b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨  b^{3, 87}_0 ∨  p_261 ∨ break
c  in DIMACS:
-6650 -6651  6652  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 87}_2 ∧ -b^{3, 87}_1 ∧ -b^{3, 87}_0 ∧ true) 
c  in CNF:
c    -b^{3, 87}_2 ∨  b^{3, 87}_1 ∨  b^{3, 87}_0 ∨ false 
c  in DIMACS:
-6650  6651  6652  0

c  3 does not represent an automaton state.
c    -(-b^{3, 87}_2 ∧  b^{3, 87}_1 ∧  b^{3, 87}_0 ∧ true) 
c  in CNF:
c     b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ false 
c  in DIMACS:
 6650 -6651 -6652  0
c  -3 does not represent an automaton state.
c    -( b^{3, 87}_2 ∧  b^{3, 87}_1 ∧  b^{3, 87}_0 ∧ true) 
c  in CNF:
c    -b^{3, 87}_2 ∨ -b^{3, 87}_1 ∨ -b^{3, 87}_0 ∨ false 
c  in DIMACS:
-6650 -6651 -6652  0

c i = 88
c  -2+1 --> -1
c    ( b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧  p_264) -> ( b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0)
c  in CNF:
c    -b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨  b^{3, 89}_2
c    -b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_1
c    -b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨  b^{3, 89}_0
c  in DIMACS:
-6653 -6654  6655 -264  6656 0
-6653 -6654  6655 -264 -6657 0
-6653 -6654  6655 -264  6658 0

c  -1+1 --> 0
c    ( b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0 ∧  p_264) -> (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧ -b^{3, 89}_0)
c  in CNF:
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_2
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_1
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_0
c  in DIMACS:
-6653  6654 -6655 -264 -6656 0
-6653  6654 -6655 -264 -6657 0
-6653  6654 -6655 -264 -6658 0

c  0+1 --> 1
c    (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧  p_264) -> (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0)
c  in CNF:
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_2
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_1
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨  b^{3, 89}_0
c  in DIMACS:
 6653  6654  6655 -264 -6656 0
 6653  6654  6655 -264 -6657 0
 6653  6654  6655 -264  6658 0

c  1+1 --> 2
c    (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0 ∧  p_264) -> (-b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0)
c  in CNF:
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_2
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨  b^{3, 89}_1
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ -p_264 ∨ -b^{3, 89}_0
c  in DIMACS:
 6653  6654 -6655 -264 -6656 0
 6653  6654 -6655 -264  6657 0
 6653  6654 -6655 -264 -6658 0

c  2+1 --> break 
c    (-b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧  p_264) -> break
c  in CNF:
c     b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 6653 -6654  6655 -264 1162 0


c  2-1 --> 1
c    (-b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧ -p_264) -> (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0)
c  in CNF:
c     b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_2
c     b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_1
c     b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨  b^{3, 89}_0
c  in DIMACS:
 6653 -6654  6655  264 -6656 0
 6653 -6654  6655  264 -6657 0
 6653 -6654  6655  264  6658 0

c  1-1 --> 0
c    (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0 ∧ -p_264) -> (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧ -b^{3, 89}_0)
c  in CNF:
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_2
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_1
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_0
c  in DIMACS:
 6653  6654 -6655  264 -6656 0
 6653  6654 -6655  264 -6657 0
 6653  6654 -6655  264 -6658 0

c  0-1 --> -1
c    (-b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧ -p_264) -> ( b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0)
c  in CNF:
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨  b^{3, 89}_2
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_1
c     b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨  b^{3, 89}_0
c  in DIMACS:
 6653  6654  6655  264  6656 0
 6653  6654  6655  264 -6657 0
 6653  6654  6655  264  6658 0

c  -1-1 --> -2
c    ( b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧  b^{3, 88}_0 ∧ -p_264) -> ( b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0)
c  in CNF:
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨  b^{3, 89}_2
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨  b^{3, 89}_1
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨  p_264 ∨ -b^{3, 89}_0
c  in DIMACS:
-6653  6654 -6655  264  6656 0
-6653  6654 -6655  264  6657 0
-6653  6654 -6655  264 -6658 0

c  -2-1 --> break 
c    ( b^{3, 88}_2 ∧  b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨  b^{3, 88}_0 ∨  p_264 ∨ break
c  in DIMACS:
-6653 -6654  6655  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 88}_2 ∧ -b^{3, 88}_1 ∧ -b^{3, 88}_0 ∧ true) 
c  in CNF:
c    -b^{3, 88}_2 ∨  b^{3, 88}_1 ∨  b^{3, 88}_0 ∨ false 
c  in DIMACS:
-6653  6654  6655  0

c  3 does not represent an automaton state.
c    -(-b^{3, 88}_2 ∧  b^{3, 88}_1 ∧  b^{3, 88}_0 ∧ true) 
c  in CNF:
c     b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ false 
c  in DIMACS:
 6653 -6654 -6655  0
c  -3 does not represent an automaton state.
c    -( b^{3, 88}_2 ∧  b^{3, 88}_1 ∧  b^{3, 88}_0 ∧ true) 
c  in CNF:
c    -b^{3, 88}_2 ∨ -b^{3, 88}_1 ∨ -b^{3, 88}_0 ∨ false 
c  in DIMACS:
-6653 -6654 -6655  0

c i = 89
c  -2+1 --> -1
c    ( b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧  p_267) -> ( b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0)
c  in CNF:
c    -b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨  b^{3, 90}_2
c    -b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_1
c    -b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨  b^{3, 90}_0
c  in DIMACS:
-6656 -6657  6658 -267  6659 0
-6656 -6657  6658 -267 -6660 0
-6656 -6657  6658 -267  6661 0

c  -1+1 --> 0
c    ( b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0 ∧  p_267) -> (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧ -b^{3, 90}_0)
c  in CNF:
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_2
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_1
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_0
c  in DIMACS:
-6656  6657 -6658 -267 -6659 0
-6656  6657 -6658 -267 -6660 0
-6656  6657 -6658 -267 -6661 0

c  0+1 --> 1
c    (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧  p_267) -> (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0)
c  in CNF:
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_2
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_1
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨  b^{3, 90}_0
c  in DIMACS:
 6656  6657  6658 -267 -6659 0
 6656  6657  6658 -267 -6660 0
 6656  6657  6658 -267  6661 0

c  1+1 --> 2
c    (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0 ∧  p_267) -> (-b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0)
c  in CNF:
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_2
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨  b^{3, 90}_1
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ -p_267 ∨ -b^{3, 90}_0
c  in DIMACS:
 6656  6657 -6658 -267 -6659 0
 6656  6657 -6658 -267  6660 0
 6656  6657 -6658 -267 -6661 0

c  2+1 --> break 
c    (-b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧  p_267) -> break
c  in CNF:
c     b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ -p_267 ∨ break
c  in DIMACS:
 6656 -6657  6658 -267 1162 0


c  2-1 --> 1
c    (-b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧ -p_267) -> (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0)
c  in CNF:
c     b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_2
c     b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_1
c     b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨  b^{3, 90}_0
c  in DIMACS:
 6656 -6657  6658  267 -6659 0
 6656 -6657  6658  267 -6660 0
 6656 -6657  6658  267  6661 0

c  1-1 --> 0
c    (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0 ∧ -p_267) -> (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧ -b^{3, 90}_0)
c  in CNF:
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_2
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_1
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_0
c  in DIMACS:
 6656  6657 -6658  267 -6659 0
 6656  6657 -6658  267 -6660 0
 6656  6657 -6658  267 -6661 0

c  0-1 --> -1
c    (-b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧ -p_267) -> ( b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0)
c  in CNF:
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨  b^{3, 90}_2
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_1
c     b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨  b^{3, 90}_0
c  in DIMACS:
 6656  6657  6658  267  6659 0
 6656  6657  6658  267 -6660 0
 6656  6657  6658  267  6661 0

c  -1-1 --> -2
c    ( b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧  b^{3, 89}_0 ∧ -p_267) -> ( b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0)
c  in CNF:
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨  b^{3, 90}_2
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨  b^{3, 90}_1
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨  p_267 ∨ -b^{3, 90}_0
c  in DIMACS:
-6656  6657 -6658  267  6659 0
-6656  6657 -6658  267  6660 0
-6656  6657 -6658  267 -6661 0

c  -2-1 --> break 
c    ( b^{3, 89}_2 ∧  b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧ -p_267) -> break
c  in CNF:
c    -b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨  b^{3, 89}_0 ∨  p_267 ∨ break
c  in DIMACS:
-6656 -6657  6658  267 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 89}_2 ∧ -b^{3, 89}_1 ∧ -b^{3, 89}_0 ∧ true) 
c  in CNF:
c    -b^{3, 89}_2 ∨  b^{3, 89}_1 ∨  b^{3, 89}_0 ∨ false 
c  in DIMACS:
-6656  6657  6658  0

c  3 does not represent an automaton state.
c    -(-b^{3, 89}_2 ∧  b^{3, 89}_1 ∧  b^{3, 89}_0 ∧ true) 
c  in CNF:
c     b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ false 
c  in DIMACS:
 6656 -6657 -6658  0
c  -3 does not represent an automaton state.
c    -( b^{3, 89}_2 ∧  b^{3, 89}_1 ∧  b^{3, 89}_0 ∧ true) 
c  in CNF:
c    -b^{3, 89}_2 ∨ -b^{3, 89}_1 ∨ -b^{3, 89}_0 ∨ false 
c  in DIMACS:
-6656 -6657 -6658  0

c i = 90
c  -2+1 --> -1
c    ( b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧  p_270) -> ( b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0)
c  in CNF:
c    -b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨  b^{3, 91}_2
c    -b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_1
c    -b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨  b^{3, 91}_0
c  in DIMACS:
-6659 -6660  6661 -270  6662 0
-6659 -6660  6661 -270 -6663 0
-6659 -6660  6661 -270  6664 0

c  -1+1 --> 0
c    ( b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0 ∧  p_270) -> (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧ -b^{3, 91}_0)
c  in CNF:
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_2
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_1
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_0
c  in DIMACS:
-6659  6660 -6661 -270 -6662 0
-6659  6660 -6661 -270 -6663 0
-6659  6660 -6661 -270 -6664 0

c  0+1 --> 1
c    (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧  p_270) -> (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0)
c  in CNF:
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_2
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_1
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨  b^{3, 91}_0
c  in DIMACS:
 6659  6660  6661 -270 -6662 0
 6659  6660  6661 -270 -6663 0
 6659  6660  6661 -270  6664 0

c  1+1 --> 2
c    (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0 ∧  p_270) -> (-b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0)
c  in CNF:
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_2
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨  b^{3, 91}_1
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ -p_270 ∨ -b^{3, 91}_0
c  in DIMACS:
 6659  6660 -6661 -270 -6662 0
 6659  6660 -6661 -270  6663 0
 6659  6660 -6661 -270 -6664 0

c  2+1 --> break 
c    (-b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧  p_270) -> break
c  in CNF:
c     b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 6659 -6660  6661 -270 1162 0


c  2-1 --> 1
c    (-b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧ -p_270) -> (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0)
c  in CNF:
c     b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_2
c     b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_1
c     b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨  b^{3, 91}_0
c  in DIMACS:
 6659 -6660  6661  270 -6662 0
 6659 -6660  6661  270 -6663 0
 6659 -6660  6661  270  6664 0

c  1-1 --> 0
c    (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0 ∧ -p_270) -> (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧ -b^{3, 91}_0)
c  in CNF:
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_2
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_1
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_0
c  in DIMACS:
 6659  6660 -6661  270 -6662 0
 6659  6660 -6661  270 -6663 0
 6659  6660 -6661  270 -6664 0

c  0-1 --> -1
c    (-b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧ -p_270) -> ( b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0)
c  in CNF:
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨  b^{3, 91}_2
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_1
c     b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨  b^{3, 91}_0
c  in DIMACS:
 6659  6660  6661  270  6662 0
 6659  6660  6661  270 -6663 0
 6659  6660  6661  270  6664 0

c  -1-1 --> -2
c    ( b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧  b^{3, 90}_0 ∧ -p_270) -> ( b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0)
c  in CNF:
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨  b^{3, 91}_2
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨  b^{3, 91}_1
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨  p_270 ∨ -b^{3, 91}_0
c  in DIMACS:
-6659  6660 -6661  270  6662 0
-6659  6660 -6661  270  6663 0
-6659  6660 -6661  270 -6664 0

c  -2-1 --> break 
c    ( b^{3, 90}_2 ∧  b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨  b^{3, 90}_0 ∨  p_270 ∨ break
c  in DIMACS:
-6659 -6660  6661  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 90}_2 ∧ -b^{3, 90}_1 ∧ -b^{3, 90}_0 ∧ true) 
c  in CNF:
c    -b^{3, 90}_2 ∨  b^{3, 90}_1 ∨  b^{3, 90}_0 ∨ false 
c  in DIMACS:
-6659  6660  6661  0

c  3 does not represent an automaton state.
c    -(-b^{3, 90}_2 ∧  b^{3, 90}_1 ∧  b^{3, 90}_0 ∧ true) 
c  in CNF:
c     b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ false 
c  in DIMACS:
 6659 -6660 -6661  0
c  -3 does not represent an automaton state.
c    -( b^{3, 90}_2 ∧  b^{3, 90}_1 ∧  b^{3, 90}_0 ∧ true) 
c  in CNF:
c    -b^{3, 90}_2 ∨ -b^{3, 90}_1 ∨ -b^{3, 90}_0 ∨ false 
c  in DIMACS:
-6659 -6660 -6661  0

c i = 91
c  -2+1 --> -1
c    ( b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧  p_273) -> ( b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0)
c  in CNF:
c    -b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨  b^{3, 92}_2
c    -b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_1
c    -b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨  b^{3, 92}_0
c  in DIMACS:
-6662 -6663  6664 -273  6665 0
-6662 -6663  6664 -273 -6666 0
-6662 -6663  6664 -273  6667 0

c  -1+1 --> 0
c    ( b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0 ∧  p_273) -> (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧ -b^{3, 92}_0)
c  in CNF:
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_2
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_1
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_0
c  in DIMACS:
-6662  6663 -6664 -273 -6665 0
-6662  6663 -6664 -273 -6666 0
-6662  6663 -6664 -273 -6667 0

c  0+1 --> 1
c    (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧  p_273) -> (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0)
c  in CNF:
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_2
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_1
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨  b^{3, 92}_0
c  in DIMACS:
 6662  6663  6664 -273 -6665 0
 6662  6663  6664 -273 -6666 0
 6662  6663  6664 -273  6667 0

c  1+1 --> 2
c    (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0 ∧  p_273) -> (-b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0)
c  in CNF:
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_2
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨  b^{3, 92}_1
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ -p_273 ∨ -b^{3, 92}_0
c  in DIMACS:
 6662  6663 -6664 -273 -6665 0
 6662  6663 -6664 -273  6666 0
 6662  6663 -6664 -273 -6667 0

c  2+1 --> break 
c    (-b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧  p_273) -> break
c  in CNF:
c     b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 6662 -6663  6664 -273 1162 0


c  2-1 --> 1
c    (-b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧ -p_273) -> (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0)
c  in CNF:
c     b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_2
c     b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_1
c     b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨  b^{3, 92}_0
c  in DIMACS:
 6662 -6663  6664  273 -6665 0
 6662 -6663  6664  273 -6666 0
 6662 -6663  6664  273  6667 0

c  1-1 --> 0
c    (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0 ∧ -p_273) -> (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧ -b^{3, 92}_0)
c  in CNF:
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_2
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_1
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_0
c  in DIMACS:
 6662  6663 -6664  273 -6665 0
 6662  6663 -6664  273 -6666 0
 6662  6663 -6664  273 -6667 0

c  0-1 --> -1
c    (-b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧ -p_273) -> ( b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0)
c  in CNF:
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨  b^{3, 92}_2
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_1
c     b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨  b^{3, 92}_0
c  in DIMACS:
 6662  6663  6664  273  6665 0
 6662  6663  6664  273 -6666 0
 6662  6663  6664  273  6667 0

c  -1-1 --> -2
c    ( b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧  b^{3, 91}_0 ∧ -p_273) -> ( b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0)
c  in CNF:
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨  b^{3, 92}_2
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨  b^{3, 92}_1
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨  p_273 ∨ -b^{3, 92}_0
c  in DIMACS:
-6662  6663 -6664  273  6665 0
-6662  6663 -6664  273  6666 0
-6662  6663 -6664  273 -6667 0

c  -2-1 --> break 
c    ( b^{3, 91}_2 ∧  b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨  b^{3, 91}_0 ∨  p_273 ∨ break
c  in DIMACS:
-6662 -6663  6664  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 91}_2 ∧ -b^{3, 91}_1 ∧ -b^{3, 91}_0 ∧ true) 
c  in CNF:
c    -b^{3, 91}_2 ∨  b^{3, 91}_1 ∨  b^{3, 91}_0 ∨ false 
c  in DIMACS:
-6662  6663  6664  0

c  3 does not represent an automaton state.
c    -(-b^{3, 91}_2 ∧  b^{3, 91}_1 ∧  b^{3, 91}_0 ∧ true) 
c  in CNF:
c     b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ false 
c  in DIMACS:
 6662 -6663 -6664  0
c  -3 does not represent an automaton state.
c    -( b^{3, 91}_2 ∧  b^{3, 91}_1 ∧  b^{3, 91}_0 ∧ true) 
c  in CNF:
c    -b^{3, 91}_2 ∨ -b^{3, 91}_1 ∨ -b^{3, 91}_0 ∨ false 
c  in DIMACS:
-6662 -6663 -6664  0

c i = 92
c  -2+1 --> -1
c    ( b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧  p_276) -> ( b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0)
c  in CNF:
c    -b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨  b^{3, 93}_2
c    -b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_1
c    -b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨  b^{3, 93}_0
c  in DIMACS:
-6665 -6666  6667 -276  6668 0
-6665 -6666  6667 -276 -6669 0
-6665 -6666  6667 -276  6670 0

c  -1+1 --> 0
c    ( b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0 ∧  p_276) -> (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧ -b^{3, 93}_0)
c  in CNF:
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_2
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_1
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_0
c  in DIMACS:
-6665  6666 -6667 -276 -6668 0
-6665  6666 -6667 -276 -6669 0
-6665  6666 -6667 -276 -6670 0

c  0+1 --> 1
c    (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧  p_276) -> (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0)
c  in CNF:
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_2
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_1
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨  b^{3, 93}_0
c  in DIMACS:
 6665  6666  6667 -276 -6668 0
 6665  6666  6667 -276 -6669 0
 6665  6666  6667 -276  6670 0

c  1+1 --> 2
c    (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0 ∧  p_276) -> (-b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0)
c  in CNF:
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_2
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨  b^{3, 93}_1
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ -p_276 ∨ -b^{3, 93}_0
c  in DIMACS:
 6665  6666 -6667 -276 -6668 0
 6665  6666 -6667 -276  6669 0
 6665  6666 -6667 -276 -6670 0

c  2+1 --> break 
c    (-b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧  p_276) -> break
c  in CNF:
c     b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 6665 -6666  6667 -276 1162 0


c  2-1 --> 1
c    (-b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧ -p_276) -> (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0)
c  in CNF:
c     b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_2
c     b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_1
c     b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨  b^{3, 93}_0
c  in DIMACS:
 6665 -6666  6667  276 -6668 0
 6665 -6666  6667  276 -6669 0
 6665 -6666  6667  276  6670 0

c  1-1 --> 0
c    (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0 ∧ -p_276) -> (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧ -b^{3, 93}_0)
c  in CNF:
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_2
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_1
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_0
c  in DIMACS:
 6665  6666 -6667  276 -6668 0
 6665  6666 -6667  276 -6669 0
 6665  6666 -6667  276 -6670 0

c  0-1 --> -1
c    (-b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧ -p_276) -> ( b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0)
c  in CNF:
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨  b^{3, 93}_2
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_1
c     b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨  b^{3, 93}_0
c  in DIMACS:
 6665  6666  6667  276  6668 0
 6665  6666  6667  276 -6669 0
 6665  6666  6667  276  6670 0

c  -1-1 --> -2
c    ( b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧  b^{3, 92}_0 ∧ -p_276) -> ( b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0)
c  in CNF:
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨  b^{3, 93}_2
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨  b^{3, 93}_1
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨  p_276 ∨ -b^{3, 93}_0
c  in DIMACS:
-6665  6666 -6667  276  6668 0
-6665  6666 -6667  276  6669 0
-6665  6666 -6667  276 -6670 0

c  -2-1 --> break 
c    ( b^{3, 92}_2 ∧  b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨  b^{3, 92}_0 ∨  p_276 ∨ break
c  in DIMACS:
-6665 -6666  6667  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 92}_2 ∧ -b^{3, 92}_1 ∧ -b^{3, 92}_0 ∧ true) 
c  in CNF:
c    -b^{3, 92}_2 ∨  b^{3, 92}_1 ∨  b^{3, 92}_0 ∨ false 
c  in DIMACS:
-6665  6666  6667  0

c  3 does not represent an automaton state.
c    -(-b^{3, 92}_2 ∧  b^{3, 92}_1 ∧  b^{3, 92}_0 ∧ true) 
c  in CNF:
c     b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ false 
c  in DIMACS:
 6665 -6666 -6667  0
c  -3 does not represent an automaton state.
c    -( b^{3, 92}_2 ∧  b^{3, 92}_1 ∧  b^{3, 92}_0 ∧ true) 
c  in CNF:
c    -b^{3, 92}_2 ∨ -b^{3, 92}_1 ∨ -b^{3, 92}_0 ∨ false 
c  in DIMACS:
-6665 -6666 -6667  0

c i = 93
c  -2+1 --> -1
c    ( b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧  p_279) -> ( b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0)
c  in CNF:
c    -b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨  b^{3, 94}_2
c    -b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_1
c    -b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨  b^{3, 94}_0
c  in DIMACS:
-6668 -6669  6670 -279  6671 0
-6668 -6669  6670 -279 -6672 0
-6668 -6669  6670 -279  6673 0

c  -1+1 --> 0
c    ( b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0 ∧  p_279) -> (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧ -b^{3, 94}_0)
c  in CNF:
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_2
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_1
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_0
c  in DIMACS:
-6668  6669 -6670 -279 -6671 0
-6668  6669 -6670 -279 -6672 0
-6668  6669 -6670 -279 -6673 0

c  0+1 --> 1
c    (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧  p_279) -> (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0)
c  in CNF:
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_2
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_1
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨  b^{3, 94}_0
c  in DIMACS:
 6668  6669  6670 -279 -6671 0
 6668  6669  6670 -279 -6672 0
 6668  6669  6670 -279  6673 0

c  1+1 --> 2
c    (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0 ∧  p_279) -> (-b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0)
c  in CNF:
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_2
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨  b^{3, 94}_1
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ -p_279 ∨ -b^{3, 94}_0
c  in DIMACS:
 6668  6669 -6670 -279 -6671 0
 6668  6669 -6670 -279  6672 0
 6668  6669 -6670 -279 -6673 0

c  2+1 --> break 
c    (-b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧  p_279) -> break
c  in CNF:
c     b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 6668 -6669  6670 -279 1162 0


c  2-1 --> 1
c    (-b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧ -p_279) -> (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0)
c  in CNF:
c     b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_2
c     b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_1
c     b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨  b^{3, 94}_0
c  in DIMACS:
 6668 -6669  6670  279 -6671 0
 6668 -6669  6670  279 -6672 0
 6668 -6669  6670  279  6673 0

c  1-1 --> 0
c    (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0 ∧ -p_279) -> (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧ -b^{3, 94}_0)
c  in CNF:
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_2
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_1
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_0
c  in DIMACS:
 6668  6669 -6670  279 -6671 0
 6668  6669 -6670  279 -6672 0
 6668  6669 -6670  279 -6673 0

c  0-1 --> -1
c    (-b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧ -p_279) -> ( b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0)
c  in CNF:
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨  b^{3, 94}_2
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_1
c     b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨  b^{3, 94}_0
c  in DIMACS:
 6668  6669  6670  279  6671 0
 6668  6669  6670  279 -6672 0
 6668  6669  6670  279  6673 0

c  -1-1 --> -2
c    ( b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧  b^{3, 93}_0 ∧ -p_279) -> ( b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0)
c  in CNF:
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨  b^{3, 94}_2
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨  b^{3, 94}_1
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨  p_279 ∨ -b^{3, 94}_0
c  in DIMACS:
-6668  6669 -6670  279  6671 0
-6668  6669 -6670  279  6672 0
-6668  6669 -6670  279 -6673 0

c  -2-1 --> break 
c    ( b^{3, 93}_2 ∧  b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨  b^{3, 93}_0 ∨  p_279 ∨ break
c  in DIMACS:
-6668 -6669  6670  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 93}_2 ∧ -b^{3, 93}_1 ∧ -b^{3, 93}_0 ∧ true) 
c  in CNF:
c    -b^{3, 93}_2 ∨  b^{3, 93}_1 ∨  b^{3, 93}_0 ∨ false 
c  in DIMACS:
-6668  6669  6670  0

c  3 does not represent an automaton state.
c    -(-b^{3, 93}_2 ∧  b^{3, 93}_1 ∧  b^{3, 93}_0 ∧ true) 
c  in CNF:
c     b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ false 
c  in DIMACS:
 6668 -6669 -6670  0
c  -3 does not represent an automaton state.
c    -( b^{3, 93}_2 ∧  b^{3, 93}_1 ∧  b^{3, 93}_0 ∧ true) 
c  in CNF:
c    -b^{3, 93}_2 ∨ -b^{3, 93}_1 ∨ -b^{3, 93}_0 ∨ false 
c  in DIMACS:
-6668 -6669 -6670  0

c i = 94
c  -2+1 --> -1
c    ( b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧  p_282) -> ( b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0)
c  in CNF:
c    -b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨  b^{3, 95}_2
c    -b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_1
c    -b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨  b^{3, 95}_0
c  in DIMACS:
-6671 -6672  6673 -282  6674 0
-6671 -6672  6673 -282 -6675 0
-6671 -6672  6673 -282  6676 0

c  -1+1 --> 0
c    ( b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0 ∧  p_282) -> (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧ -b^{3, 95}_0)
c  in CNF:
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_2
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_1
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_0
c  in DIMACS:
-6671  6672 -6673 -282 -6674 0
-6671  6672 -6673 -282 -6675 0
-6671  6672 -6673 -282 -6676 0

c  0+1 --> 1
c    (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧  p_282) -> (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0)
c  in CNF:
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_2
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_1
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨  b^{3, 95}_0
c  in DIMACS:
 6671  6672  6673 -282 -6674 0
 6671  6672  6673 -282 -6675 0
 6671  6672  6673 -282  6676 0

c  1+1 --> 2
c    (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0 ∧  p_282) -> (-b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0)
c  in CNF:
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_2
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨  b^{3, 95}_1
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ -p_282 ∨ -b^{3, 95}_0
c  in DIMACS:
 6671  6672 -6673 -282 -6674 0
 6671  6672 -6673 -282  6675 0
 6671  6672 -6673 -282 -6676 0

c  2+1 --> break 
c    (-b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧  p_282) -> break
c  in CNF:
c     b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 6671 -6672  6673 -282 1162 0


c  2-1 --> 1
c    (-b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧ -p_282) -> (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0)
c  in CNF:
c     b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_2
c     b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_1
c     b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨  b^{3, 95}_0
c  in DIMACS:
 6671 -6672  6673  282 -6674 0
 6671 -6672  6673  282 -6675 0
 6671 -6672  6673  282  6676 0

c  1-1 --> 0
c    (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0 ∧ -p_282) -> (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧ -b^{3, 95}_0)
c  in CNF:
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_2
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_1
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_0
c  in DIMACS:
 6671  6672 -6673  282 -6674 0
 6671  6672 -6673  282 -6675 0
 6671  6672 -6673  282 -6676 0

c  0-1 --> -1
c    (-b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧ -p_282) -> ( b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0)
c  in CNF:
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨  b^{3, 95}_2
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_1
c     b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨  b^{3, 95}_0
c  in DIMACS:
 6671  6672  6673  282  6674 0
 6671  6672  6673  282 -6675 0
 6671  6672  6673  282  6676 0

c  -1-1 --> -2
c    ( b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧  b^{3, 94}_0 ∧ -p_282) -> ( b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0)
c  in CNF:
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨  b^{3, 95}_2
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨  b^{3, 95}_1
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨  p_282 ∨ -b^{3, 95}_0
c  in DIMACS:
-6671  6672 -6673  282  6674 0
-6671  6672 -6673  282  6675 0
-6671  6672 -6673  282 -6676 0

c  -2-1 --> break 
c    ( b^{3, 94}_2 ∧  b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨  b^{3, 94}_0 ∨  p_282 ∨ break
c  in DIMACS:
-6671 -6672  6673  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 94}_2 ∧ -b^{3, 94}_1 ∧ -b^{3, 94}_0 ∧ true) 
c  in CNF:
c    -b^{3, 94}_2 ∨  b^{3, 94}_1 ∨  b^{3, 94}_0 ∨ false 
c  in DIMACS:
-6671  6672  6673  0

c  3 does not represent an automaton state.
c    -(-b^{3, 94}_2 ∧  b^{3, 94}_1 ∧  b^{3, 94}_0 ∧ true) 
c  in CNF:
c     b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ false 
c  in DIMACS:
 6671 -6672 -6673  0
c  -3 does not represent an automaton state.
c    -( b^{3, 94}_2 ∧  b^{3, 94}_1 ∧  b^{3, 94}_0 ∧ true) 
c  in CNF:
c    -b^{3, 94}_2 ∨ -b^{3, 94}_1 ∨ -b^{3, 94}_0 ∨ false 
c  in DIMACS:
-6671 -6672 -6673  0

c i = 95
c  -2+1 --> -1
c    ( b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧  p_285) -> ( b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0)
c  in CNF:
c    -b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨  b^{3, 96}_2
c    -b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_1
c    -b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨  b^{3, 96}_0
c  in DIMACS:
-6674 -6675  6676 -285  6677 0
-6674 -6675  6676 -285 -6678 0
-6674 -6675  6676 -285  6679 0

c  -1+1 --> 0
c    ( b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0 ∧  p_285) -> (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧ -b^{3, 96}_0)
c  in CNF:
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_2
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_1
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_0
c  in DIMACS:
-6674  6675 -6676 -285 -6677 0
-6674  6675 -6676 -285 -6678 0
-6674  6675 -6676 -285 -6679 0

c  0+1 --> 1
c    (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧  p_285) -> (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0)
c  in CNF:
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_2
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_1
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨  b^{3, 96}_0
c  in DIMACS:
 6674  6675  6676 -285 -6677 0
 6674  6675  6676 -285 -6678 0
 6674  6675  6676 -285  6679 0

c  1+1 --> 2
c    (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0 ∧  p_285) -> (-b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0)
c  in CNF:
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_2
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨  b^{3, 96}_1
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ -p_285 ∨ -b^{3, 96}_0
c  in DIMACS:
 6674  6675 -6676 -285 -6677 0
 6674  6675 -6676 -285  6678 0
 6674  6675 -6676 -285 -6679 0

c  2+1 --> break 
c    (-b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧  p_285) -> break
c  in CNF:
c     b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 6674 -6675  6676 -285 1162 0


c  2-1 --> 1
c    (-b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧ -p_285) -> (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0)
c  in CNF:
c     b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_2
c     b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_1
c     b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨  b^{3, 96}_0
c  in DIMACS:
 6674 -6675  6676  285 -6677 0
 6674 -6675  6676  285 -6678 0
 6674 -6675  6676  285  6679 0

c  1-1 --> 0
c    (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0 ∧ -p_285) -> (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧ -b^{3, 96}_0)
c  in CNF:
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_2
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_1
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_0
c  in DIMACS:
 6674  6675 -6676  285 -6677 0
 6674  6675 -6676  285 -6678 0
 6674  6675 -6676  285 -6679 0

c  0-1 --> -1
c    (-b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧ -p_285) -> ( b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0)
c  in CNF:
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨  b^{3, 96}_2
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_1
c     b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨  b^{3, 96}_0
c  in DIMACS:
 6674  6675  6676  285  6677 0
 6674  6675  6676  285 -6678 0
 6674  6675  6676  285  6679 0

c  -1-1 --> -2
c    ( b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧  b^{3, 95}_0 ∧ -p_285) -> ( b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0)
c  in CNF:
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨  b^{3, 96}_2
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨  b^{3, 96}_1
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨  p_285 ∨ -b^{3, 96}_0
c  in DIMACS:
-6674  6675 -6676  285  6677 0
-6674  6675 -6676  285  6678 0
-6674  6675 -6676  285 -6679 0

c  -2-1 --> break 
c    ( b^{3, 95}_2 ∧  b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨  b^{3, 95}_0 ∨  p_285 ∨ break
c  in DIMACS:
-6674 -6675  6676  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 95}_2 ∧ -b^{3, 95}_1 ∧ -b^{3, 95}_0 ∧ true) 
c  in CNF:
c    -b^{3, 95}_2 ∨  b^{3, 95}_1 ∨  b^{3, 95}_0 ∨ false 
c  in DIMACS:
-6674  6675  6676  0

c  3 does not represent an automaton state.
c    -(-b^{3, 95}_2 ∧  b^{3, 95}_1 ∧  b^{3, 95}_0 ∧ true) 
c  in CNF:
c     b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ false 
c  in DIMACS:
 6674 -6675 -6676  0
c  -3 does not represent an automaton state.
c    -( b^{3, 95}_2 ∧  b^{3, 95}_1 ∧  b^{3, 95}_0 ∧ true) 
c  in CNF:
c    -b^{3, 95}_2 ∨ -b^{3, 95}_1 ∨ -b^{3, 95}_0 ∨ false 
c  in DIMACS:
-6674 -6675 -6676  0

c i = 96
c  -2+1 --> -1
c    ( b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧  p_288) -> ( b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0)
c  in CNF:
c    -b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨  b^{3, 97}_2
c    -b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_1
c    -b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨  b^{3, 97}_0
c  in DIMACS:
-6677 -6678  6679 -288  6680 0
-6677 -6678  6679 -288 -6681 0
-6677 -6678  6679 -288  6682 0

c  -1+1 --> 0
c    ( b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0 ∧  p_288) -> (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧ -b^{3, 97}_0)
c  in CNF:
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_2
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_1
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_0
c  in DIMACS:
-6677  6678 -6679 -288 -6680 0
-6677  6678 -6679 -288 -6681 0
-6677  6678 -6679 -288 -6682 0

c  0+1 --> 1
c    (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧  p_288) -> (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0)
c  in CNF:
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_2
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_1
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨  b^{3, 97}_0
c  in DIMACS:
 6677  6678  6679 -288 -6680 0
 6677  6678  6679 -288 -6681 0
 6677  6678  6679 -288  6682 0

c  1+1 --> 2
c    (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0 ∧  p_288) -> (-b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0)
c  in CNF:
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_2
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨  b^{3, 97}_1
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ -p_288 ∨ -b^{3, 97}_0
c  in DIMACS:
 6677  6678 -6679 -288 -6680 0
 6677  6678 -6679 -288  6681 0
 6677  6678 -6679 -288 -6682 0

c  2+1 --> break 
c    (-b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧  p_288) -> break
c  in CNF:
c     b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 6677 -6678  6679 -288 1162 0


c  2-1 --> 1
c    (-b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧ -p_288) -> (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0)
c  in CNF:
c     b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_2
c     b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_1
c     b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨  b^{3, 97}_0
c  in DIMACS:
 6677 -6678  6679  288 -6680 0
 6677 -6678  6679  288 -6681 0
 6677 -6678  6679  288  6682 0

c  1-1 --> 0
c    (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0 ∧ -p_288) -> (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧ -b^{3, 97}_0)
c  in CNF:
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_2
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_1
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_0
c  in DIMACS:
 6677  6678 -6679  288 -6680 0
 6677  6678 -6679  288 -6681 0
 6677  6678 -6679  288 -6682 0

c  0-1 --> -1
c    (-b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧ -p_288) -> ( b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0)
c  in CNF:
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨  b^{3, 97}_2
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_1
c     b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨  b^{3, 97}_0
c  in DIMACS:
 6677  6678  6679  288  6680 0
 6677  6678  6679  288 -6681 0
 6677  6678  6679  288  6682 0

c  -1-1 --> -2
c    ( b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧  b^{3, 96}_0 ∧ -p_288) -> ( b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0)
c  in CNF:
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨  b^{3, 97}_2
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨  b^{3, 97}_1
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨  p_288 ∨ -b^{3, 97}_0
c  in DIMACS:
-6677  6678 -6679  288  6680 0
-6677  6678 -6679  288  6681 0
-6677  6678 -6679  288 -6682 0

c  -2-1 --> break 
c    ( b^{3, 96}_2 ∧  b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨  b^{3, 96}_0 ∨  p_288 ∨ break
c  in DIMACS:
-6677 -6678  6679  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 96}_2 ∧ -b^{3, 96}_1 ∧ -b^{3, 96}_0 ∧ true) 
c  in CNF:
c    -b^{3, 96}_2 ∨  b^{3, 96}_1 ∨  b^{3, 96}_0 ∨ false 
c  in DIMACS:
-6677  6678  6679  0

c  3 does not represent an automaton state.
c    -(-b^{3, 96}_2 ∧  b^{3, 96}_1 ∧  b^{3, 96}_0 ∧ true) 
c  in CNF:
c     b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ false 
c  in DIMACS:
 6677 -6678 -6679  0
c  -3 does not represent an automaton state.
c    -( b^{3, 96}_2 ∧  b^{3, 96}_1 ∧  b^{3, 96}_0 ∧ true) 
c  in CNF:
c    -b^{3, 96}_2 ∨ -b^{3, 96}_1 ∨ -b^{3, 96}_0 ∨ false 
c  in DIMACS:
-6677 -6678 -6679  0

c i = 97
c  -2+1 --> -1
c    ( b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧  p_291) -> ( b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0)
c  in CNF:
c    -b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨  b^{3, 98}_2
c    -b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_1
c    -b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨  b^{3, 98}_0
c  in DIMACS:
-6680 -6681  6682 -291  6683 0
-6680 -6681  6682 -291 -6684 0
-6680 -6681  6682 -291  6685 0

c  -1+1 --> 0
c    ( b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0 ∧  p_291) -> (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧ -b^{3, 98}_0)
c  in CNF:
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_2
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_1
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_0
c  in DIMACS:
-6680  6681 -6682 -291 -6683 0
-6680  6681 -6682 -291 -6684 0
-6680  6681 -6682 -291 -6685 0

c  0+1 --> 1
c    (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧  p_291) -> (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0)
c  in CNF:
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_2
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_1
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨  b^{3, 98}_0
c  in DIMACS:
 6680  6681  6682 -291 -6683 0
 6680  6681  6682 -291 -6684 0
 6680  6681  6682 -291  6685 0

c  1+1 --> 2
c    (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0 ∧  p_291) -> (-b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0)
c  in CNF:
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_2
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨  b^{3, 98}_1
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ -p_291 ∨ -b^{3, 98}_0
c  in DIMACS:
 6680  6681 -6682 -291 -6683 0
 6680  6681 -6682 -291  6684 0
 6680  6681 -6682 -291 -6685 0

c  2+1 --> break 
c    (-b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧  p_291) -> break
c  in CNF:
c     b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ -p_291 ∨ break
c  in DIMACS:
 6680 -6681  6682 -291 1162 0


c  2-1 --> 1
c    (-b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧ -p_291) -> (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0)
c  in CNF:
c     b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_2
c     b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_1
c     b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨  b^{3, 98}_0
c  in DIMACS:
 6680 -6681  6682  291 -6683 0
 6680 -6681  6682  291 -6684 0
 6680 -6681  6682  291  6685 0

c  1-1 --> 0
c    (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0 ∧ -p_291) -> (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧ -b^{3, 98}_0)
c  in CNF:
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_2
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_1
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_0
c  in DIMACS:
 6680  6681 -6682  291 -6683 0
 6680  6681 -6682  291 -6684 0
 6680  6681 -6682  291 -6685 0

c  0-1 --> -1
c    (-b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧ -p_291) -> ( b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0)
c  in CNF:
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨  b^{3, 98}_2
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_1
c     b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨  b^{3, 98}_0
c  in DIMACS:
 6680  6681  6682  291  6683 0
 6680  6681  6682  291 -6684 0
 6680  6681  6682  291  6685 0

c  -1-1 --> -2
c    ( b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧  b^{3, 97}_0 ∧ -p_291) -> ( b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0)
c  in CNF:
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨  b^{3, 98}_2
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨  b^{3, 98}_1
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨  p_291 ∨ -b^{3, 98}_0
c  in DIMACS:
-6680  6681 -6682  291  6683 0
-6680  6681 -6682  291  6684 0
-6680  6681 -6682  291 -6685 0

c  -2-1 --> break 
c    ( b^{3, 97}_2 ∧  b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧ -p_291) -> break
c  in CNF:
c    -b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨  b^{3, 97}_0 ∨  p_291 ∨ break
c  in DIMACS:
-6680 -6681  6682  291 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 97}_2 ∧ -b^{3, 97}_1 ∧ -b^{3, 97}_0 ∧ true) 
c  in CNF:
c    -b^{3, 97}_2 ∨  b^{3, 97}_1 ∨  b^{3, 97}_0 ∨ false 
c  in DIMACS:
-6680  6681  6682  0

c  3 does not represent an automaton state.
c    -(-b^{3, 97}_2 ∧  b^{3, 97}_1 ∧  b^{3, 97}_0 ∧ true) 
c  in CNF:
c     b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ false 
c  in DIMACS:
 6680 -6681 -6682  0
c  -3 does not represent an automaton state.
c    -( b^{3, 97}_2 ∧  b^{3, 97}_1 ∧  b^{3, 97}_0 ∧ true) 
c  in CNF:
c    -b^{3, 97}_2 ∨ -b^{3, 97}_1 ∨ -b^{3, 97}_0 ∨ false 
c  in DIMACS:
-6680 -6681 -6682  0

c i = 98
c  -2+1 --> -1
c    ( b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧  p_294) -> ( b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0)
c  in CNF:
c    -b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨  b^{3, 99}_2
c    -b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_1
c    -b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨  b^{3, 99}_0
c  in DIMACS:
-6683 -6684  6685 -294  6686 0
-6683 -6684  6685 -294 -6687 0
-6683 -6684  6685 -294  6688 0

c  -1+1 --> 0
c    ( b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0 ∧  p_294) -> (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧ -b^{3, 99}_0)
c  in CNF:
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_2
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_1
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_0
c  in DIMACS:
-6683  6684 -6685 -294 -6686 0
-6683  6684 -6685 -294 -6687 0
-6683  6684 -6685 -294 -6688 0

c  0+1 --> 1
c    (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧  p_294) -> (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0)
c  in CNF:
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_2
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_1
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨  b^{3, 99}_0
c  in DIMACS:
 6683  6684  6685 -294 -6686 0
 6683  6684  6685 -294 -6687 0
 6683  6684  6685 -294  6688 0

c  1+1 --> 2
c    (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0 ∧  p_294) -> (-b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0)
c  in CNF:
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_2
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨  b^{3, 99}_1
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ -p_294 ∨ -b^{3, 99}_0
c  in DIMACS:
 6683  6684 -6685 -294 -6686 0
 6683  6684 -6685 -294  6687 0
 6683  6684 -6685 -294 -6688 0

c  2+1 --> break 
c    (-b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧  p_294) -> break
c  in CNF:
c     b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 6683 -6684  6685 -294 1162 0


c  2-1 --> 1
c    (-b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧ -p_294) -> (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0)
c  in CNF:
c     b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_2
c     b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_1
c     b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨  b^{3, 99}_0
c  in DIMACS:
 6683 -6684  6685  294 -6686 0
 6683 -6684  6685  294 -6687 0
 6683 -6684  6685  294  6688 0

c  1-1 --> 0
c    (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0 ∧ -p_294) -> (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧ -b^{3, 99}_0)
c  in CNF:
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_2
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_1
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_0
c  in DIMACS:
 6683  6684 -6685  294 -6686 0
 6683  6684 -6685  294 -6687 0
 6683  6684 -6685  294 -6688 0

c  0-1 --> -1
c    (-b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧ -p_294) -> ( b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0)
c  in CNF:
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨  b^{3, 99}_2
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_1
c     b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨  b^{3, 99}_0
c  in DIMACS:
 6683  6684  6685  294  6686 0
 6683  6684  6685  294 -6687 0
 6683  6684  6685  294  6688 0

c  -1-1 --> -2
c    ( b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧  b^{3, 98}_0 ∧ -p_294) -> ( b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0)
c  in CNF:
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨  b^{3, 99}_2
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨  b^{3, 99}_1
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨  p_294 ∨ -b^{3, 99}_0
c  in DIMACS:
-6683  6684 -6685  294  6686 0
-6683  6684 -6685  294  6687 0
-6683  6684 -6685  294 -6688 0

c  -2-1 --> break 
c    ( b^{3, 98}_2 ∧  b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨  b^{3, 98}_0 ∨  p_294 ∨ break
c  in DIMACS:
-6683 -6684  6685  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 98}_2 ∧ -b^{3, 98}_1 ∧ -b^{3, 98}_0 ∧ true) 
c  in CNF:
c    -b^{3, 98}_2 ∨  b^{3, 98}_1 ∨  b^{3, 98}_0 ∨ false 
c  in DIMACS:
-6683  6684  6685  0

c  3 does not represent an automaton state.
c    -(-b^{3, 98}_2 ∧  b^{3, 98}_1 ∧  b^{3, 98}_0 ∧ true) 
c  in CNF:
c     b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ false 
c  in DIMACS:
 6683 -6684 -6685  0
c  -3 does not represent an automaton state.
c    -( b^{3, 98}_2 ∧  b^{3, 98}_1 ∧  b^{3, 98}_0 ∧ true) 
c  in CNF:
c    -b^{3, 98}_2 ∨ -b^{3, 98}_1 ∨ -b^{3, 98}_0 ∨ false 
c  in DIMACS:
-6683 -6684 -6685  0

c i = 99
c  -2+1 --> -1
c    ( b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧  p_297) -> ( b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0)
c  in CNF:
c    -b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨  b^{3, 100}_2
c    -b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_1
c    -b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨  b^{3, 100}_0
c  in DIMACS:
-6686 -6687  6688 -297  6689 0
-6686 -6687  6688 -297 -6690 0
-6686 -6687  6688 -297  6691 0

c  -1+1 --> 0
c    ( b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0 ∧  p_297) -> (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧ -b^{3, 100}_0)
c  in CNF:
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_2
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_1
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_0
c  in DIMACS:
-6686  6687 -6688 -297 -6689 0
-6686  6687 -6688 -297 -6690 0
-6686  6687 -6688 -297 -6691 0

c  0+1 --> 1
c    (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧  p_297) -> (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0)
c  in CNF:
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_2
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_1
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨  b^{3, 100}_0
c  in DIMACS:
 6686  6687  6688 -297 -6689 0
 6686  6687  6688 -297 -6690 0
 6686  6687  6688 -297  6691 0

c  1+1 --> 2
c    (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0 ∧  p_297) -> (-b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0)
c  in CNF:
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_2
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨  b^{3, 100}_1
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ -p_297 ∨ -b^{3, 100}_0
c  in DIMACS:
 6686  6687 -6688 -297 -6689 0
 6686  6687 -6688 -297  6690 0
 6686  6687 -6688 -297 -6691 0

c  2+1 --> break 
c    (-b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧  p_297) -> break
c  in CNF:
c     b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 6686 -6687  6688 -297 1162 0


c  2-1 --> 1
c    (-b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧ -p_297) -> (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0)
c  in CNF:
c     b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_2
c     b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_1
c     b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨  b^{3, 100}_0
c  in DIMACS:
 6686 -6687  6688  297 -6689 0
 6686 -6687  6688  297 -6690 0
 6686 -6687  6688  297  6691 0

c  1-1 --> 0
c    (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0 ∧ -p_297) -> (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧ -b^{3, 100}_0)
c  in CNF:
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_2
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_1
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_0
c  in DIMACS:
 6686  6687 -6688  297 -6689 0
 6686  6687 -6688  297 -6690 0
 6686  6687 -6688  297 -6691 0

c  0-1 --> -1
c    (-b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧ -p_297) -> ( b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0)
c  in CNF:
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨  b^{3, 100}_2
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_1
c     b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨  b^{3, 100}_0
c  in DIMACS:
 6686  6687  6688  297  6689 0
 6686  6687  6688  297 -6690 0
 6686  6687  6688  297  6691 0

c  -1-1 --> -2
c    ( b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧  b^{3, 99}_0 ∧ -p_297) -> ( b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0)
c  in CNF:
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨  b^{3, 100}_2
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨  b^{3, 100}_1
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨  p_297 ∨ -b^{3, 100}_0
c  in DIMACS:
-6686  6687 -6688  297  6689 0
-6686  6687 -6688  297  6690 0
-6686  6687 -6688  297 -6691 0

c  -2-1 --> break 
c    ( b^{3, 99}_2 ∧  b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨  b^{3, 99}_0 ∨  p_297 ∨ break
c  in DIMACS:
-6686 -6687  6688  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 99}_2 ∧ -b^{3, 99}_1 ∧ -b^{3, 99}_0 ∧ true) 
c  in CNF:
c    -b^{3, 99}_2 ∨  b^{3, 99}_1 ∨  b^{3, 99}_0 ∨ false 
c  in DIMACS:
-6686  6687  6688  0

c  3 does not represent an automaton state.
c    -(-b^{3, 99}_2 ∧  b^{3, 99}_1 ∧  b^{3, 99}_0 ∧ true) 
c  in CNF:
c     b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ false 
c  in DIMACS:
 6686 -6687 -6688  0
c  -3 does not represent an automaton state.
c    -( b^{3, 99}_2 ∧  b^{3, 99}_1 ∧  b^{3, 99}_0 ∧ true) 
c  in CNF:
c    -b^{3, 99}_2 ∨ -b^{3, 99}_1 ∨ -b^{3, 99}_0 ∨ false 
c  in DIMACS:
-6686 -6687 -6688  0

c i = 100
c  -2+1 --> -1
c    ( b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧  p_300) -> ( b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0)
c  in CNF:
c    -b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨  b^{3, 101}_2
c    -b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_1
c    -b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨  b^{3, 101}_0
c  in DIMACS:
-6689 -6690  6691 -300  6692 0
-6689 -6690  6691 -300 -6693 0
-6689 -6690  6691 -300  6694 0

c  -1+1 --> 0
c    ( b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0 ∧  p_300) -> (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧ -b^{3, 101}_0)
c  in CNF:
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_2
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_1
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_0
c  in DIMACS:
-6689  6690 -6691 -300 -6692 0
-6689  6690 -6691 -300 -6693 0
-6689  6690 -6691 -300 -6694 0

c  0+1 --> 1
c    (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧  p_300) -> (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0)
c  in CNF:
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_2
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_1
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨  b^{3, 101}_0
c  in DIMACS:
 6689  6690  6691 -300 -6692 0
 6689  6690  6691 -300 -6693 0
 6689  6690  6691 -300  6694 0

c  1+1 --> 2
c    (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0 ∧  p_300) -> (-b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0)
c  in CNF:
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_2
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨  b^{3, 101}_1
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ -p_300 ∨ -b^{3, 101}_0
c  in DIMACS:
 6689  6690 -6691 -300 -6692 0
 6689  6690 -6691 -300  6693 0
 6689  6690 -6691 -300 -6694 0

c  2+1 --> break 
c    (-b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧  p_300) -> break
c  in CNF:
c     b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 6689 -6690  6691 -300 1162 0


c  2-1 --> 1
c    (-b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧ -p_300) -> (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0)
c  in CNF:
c     b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_2
c     b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_1
c     b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨  b^{3, 101}_0
c  in DIMACS:
 6689 -6690  6691  300 -6692 0
 6689 -6690  6691  300 -6693 0
 6689 -6690  6691  300  6694 0

c  1-1 --> 0
c    (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0 ∧ -p_300) -> (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧ -b^{3, 101}_0)
c  in CNF:
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_2
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_1
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_0
c  in DIMACS:
 6689  6690 -6691  300 -6692 0
 6689  6690 -6691  300 -6693 0
 6689  6690 -6691  300 -6694 0

c  0-1 --> -1
c    (-b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧ -p_300) -> ( b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0)
c  in CNF:
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨  b^{3, 101}_2
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_1
c     b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨  b^{3, 101}_0
c  in DIMACS:
 6689  6690  6691  300  6692 0
 6689  6690  6691  300 -6693 0
 6689  6690  6691  300  6694 0

c  -1-1 --> -2
c    ( b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧  b^{3, 100}_0 ∧ -p_300) -> ( b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0)
c  in CNF:
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨  b^{3, 101}_2
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨  b^{3, 101}_1
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨  p_300 ∨ -b^{3, 101}_0
c  in DIMACS:
-6689  6690 -6691  300  6692 0
-6689  6690 -6691  300  6693 0
-6689  6690 -6691  300 -6694 0

c  -2-1 --> break 
c    ( b^{3, 100}_2 ∧  b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨  b^{3, 100}_0 ∨  p_300 ∨ break
c  in DIMACS:
-6689 -6690  6691  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 100}_2 ∧ -b^{3, 100}_1 ∧ -b^{3, 100}_0 ∧ true) 
c  in CNF:
c    -b^{3, 100}_2 ∨  b^{3, 100}_1 ∨  b^{3, 100}_0 ∨ false 
c  in DIMACS:
-6689  6690  6691  0

c  3 does not represent an automaton state.
c    -(-b^{3, 100}_2 ∧  b^{3, 100}_1 ∧  b^{3, 100}_0 ∧ true) 
c  in CNF:
c     b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ false 
c  in DIMACS:
 6689 -6690 -6691  0
c  -3 does not represent an automaton state.
c    -( b^{3, 100}_2 ∧  b^{3, 100}_1 ∧  b^{3, 100}_0 ∧ true) 
c  in CNF:
c    -b^{3, 100}_2 ∨ -b^{3, 100}_1 ∨ -b^{3, 100}_0 ∨ false 
c  in DIMACS:
-6689 -6690 -6691  0

c i = 101
c  -2+1 --> -1
c    ( b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧  p_303) -> ( b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0)
c  in CNF:
c    -b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨  b^{3, 102}_2
c    -b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_1
c    -b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨  b^{3, 102}_0
c  in DIMACS:
-6692 -6693  6694 -303  6695 0
-6692 -6693  6694 -303 -6696 0
-6692 -6693  6694 -303  6697 0

c  -1+1 --> 0
c    ( b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0 ∧  p_303) -> (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧ -b^{3, 102}_0)
c  in CNF:
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_2
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_1
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_0
c  in DIMACS:
-6692  6693 -6694 -303 -6695 0
-6692  6693 -6694 -303 -6696 0
-6692  6693 -6694 -303 -6697 0

c  0+1 --> 1
c    (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧  p_303) -> (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0)
c  in CNF:
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_2
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_1
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨  b^{3, 102}_0
c  in DIMACS:
 6692  6693  6694 -303 -6695 0
 6692  6693  6694 -303 -6696 0
 6692  6693  6694 -303  6697 0

c  1+1 --> 2
c    (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0 ∧  p_303) -> (-b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0)
c  in CNF:
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_2
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨  b^{3, 102}_1
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ -p_303 ∨ -b^{3, 102}_0
c  in DIMACS:
 6692  6693 -6694 -303 -6695 0
 6692  6693 -6694 -303  6696 0
 6692  6693 -6694 -303 -6697 0

c  2+1 --> break 
c    (-b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧  p_303) -> break
c  in CNF:
c     b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ -p_303 ∨ break
c  in DIMACS:
 6692 -6693  6694 -303 1162 0


c  2-1 --> 1
c    (-b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧ -p_303) -> (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0)
c  in CNF:
c     b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_2
c     b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_1
c     b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨  b^{3, 102}_0
c  in DIMACS:
 6692 -6693  6694  303 -6695 0
 6692 -6693  6694  303 -6696 0
 6692 -6693  6694  303  6697 0

c  1-1 --> 0
c    (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0 ∧ -p_303) -> (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧ -b^{3, 102}_0)
c  in CNF:
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_2
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_1
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_0
c  in DIMACS:
 6692  6693 -6694  303 -6695 0
 6692  6693 -6694  303 -6696 0
 6692  6693 -6694  303 -6697 0

c  0-1 --> -1
c    (-b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧ -p_303) -> ( b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0)
c  in CNF:
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨  b^{3, 102}_2
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_1
c     b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨  b^{3, 102}_0
c  in DIMACS:
 6692  6693  6694  303  6695 0
 6692  6693  6694  303 -6696 0
 6692  6693  6694  303  6697 0

c  -1-1 --> -2
c    ( b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧  b^{3, 101}_0 ∧ -p_303) -> ( b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0)
c  in CNF:
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨  b^{3, 102}_2
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨  b^{3, 102}_1
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨  p_303 ∨ -b^{3, 102}_0
c  in DIMACS:
-6692  6693 -6694  303  6695 0
-6692  6693 -6694  303  6696 0
-6692  6693 -6694  303 -6697 0

c  -2-1 --> break 
c    ( b^{3, 101}_2 ∧  b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧ -p_303) -> break
c  in CNF:
c    -b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨  b^{3, 101}_0 ∨  p_303 ∨ break
c  in DIMACS:
-6692 -6693  6694  303 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 101}_2 ∧ -b^{3, 101}_1 ∧ -b^{3, 101}_0 ∧ true) 
c  in CNF:
c    -b^{3, 101}_2 ∨  b^{3, 101}_1 ∨  b^{3, 101}_0 ∨ false 
c  in DIMACS:
-6692  6693  6694  0

c  3 does not represent an automaton state.
c    -(-b^{3, 101}_2 ∧  b^{3, 101}_1 ∧  b^{3, 101}_0 ∧ true) 
c  in CNF:
c     b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ false 
c  in DIMACS:
 6692 -6693 -6694  0
c  -3 does not represent an automaton state.
c    -( b^{3, 101}_2 ∧  b^{3, 101}_1 ∧  b^{3, 101}_0 ∧ true) 
c  in CNF:
c    -b^{3, 101}_2 ∨ -b^{3, 101}_1 ∨ -b^{3, 101}_0 ∨ false 
c  in DIMACS:
-6692 -6693 -6694  0

c i = 102
c  -2+1 --> -1
c    ( b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧  p_306) -> ( b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0)
c  in CNF:
c    -b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨  b^{3, 103}_2
c    -b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_1
c    -b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨  b^{3, 103}_0
c  in DIMACS:
-6695 -6696  6697 -306  6698 0
-6695 -6696  6697 -306 -6699 0
-6695 -6696  6697 -306  6700 0

c  -1+1 --> 0
c    ( b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0 ∧  p_306) -> (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧ -b^{3, 103}_0)
c  in CNF:
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_2
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_1
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_0
c  in DIMACS:
-6695  6696 -6697 -306 -6698 0
-6695  6696 -6697 -306 -6699 0
-6695  6696 -6697 -306 -6700 0

c  0+1 --> 1
c    (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧  p_306) -> (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0)
c  in CNF:
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_2
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_1
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨  b^{3, 103}_0
c  in DIMACS:
 6695  6696  6697 -306 -6698 0
 6695  6696  6697 -306 -6699 0
 6695  6696  6697 -306  6700 0

c  1+1 --> 2
c    (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0 ∧  p_306) -> (-b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0)
c  in CNF:
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_2
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨  b^{3, 103}_1
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ -p_306 ∨ -b^{3, 103}_0
c  in DIMACS:
 6695  6696 -6697 -306 -6698 0
 6695  6696 -6697 -306  6699 0
 6695  6696 -6697 -306 -6700 0

c  2+1 --> break 
c    (-b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧  p_306) -> break
c  in CNF:
c     b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 6695 -6696  6697 -306 1162 0


c  2-1 --> 1
c    (-b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧ -p_306) -> (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0)
c  in CNF:
c     b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_2
c     b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_1
c     b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨  b^{3, 103}_0
c  in DIMACS:
 6695 -6696  6697  306 -6698 0
 6695 -6696  6697  306 -6699 0
 6695 -6696  6697  306  6700 0

c  1-1 --> 0
c    (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0 ∧ -p_306) -> (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧ -b^{3, 103}_0)
c  in CNF:
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_2
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_1
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_0
c  in DIMACS:
 6695  6696 -6697  306 -6698 0
 6695  6696 -6697  306 -6699 0
 6695  6696 -6697  306 -6700 0

c  0-1 --> -1
c    (-b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧ -p_306) -> ( b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0)
c  in CNF:
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨  b^{3, 103}_2
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_1
c     b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨  b^{3, 103}_0
c  in DIMACS:
 6695  6696  6697  306  6698 0
 6695  6696  6697  306 -6699 0
 6695  6696  6697  306  6700 0

c  -1-1 --> -2
c    ( b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧  b^{3, 102}_0 ∧ -p_306) -> ( b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0)
c  in CNF:
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨  b^{3, 103}_2
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨  b^{3, 103}_1
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨  p_306 ∨ -b^{3, 103}_0
c  in DIMACS:
-6695  6696 -6697  306  6698 0
-6695  6696 -6697  306  6699 0
-6695  6696 -6697  306 -6700 0

c  -2-1 --> break 
c    ( b^{3, 102}_2 ∧  b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨  b^{3, 102}_0 ∨  p_306 ∨ break
c  in DIMACS:
-6695 -6696  6697  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 102}_2 ∧ -b^{3, 102}_1 ∧ -b^{3, 102}_0 ∧ true) 
c  in CNF:
c    -b^{3, 102}_2 ∨  b^{3, 102}_1 ∨  b^{3, 102}_0 ∨ false 
c  in DIMACS:
-6695  6696  6697  0

c  3 does not represent an automaton state.
c    -(-b^{3, 102}_2 ∧  b^{3, 102}_1 ∧  b^{3, 102}_0 ∧ true) 
c  in CNF:
c     b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ false 
c  in DIMACS:
 6695 -6696 -6697  0
c  -3 does not represent an automaton state.
c    -( b^{3, 102}_2 ∧  b^{3, 102}_1 ∧  b^{3, 102}_0 ∧ true) 
c  in CNF:
c    -b^{3, 102}_2 ∨ -b^{3, 102}_1 ∨ -b^{3, 102}_0 ∨ false 
c  in DIMACS:
-6695 -6696 -6697  0

c i = 103
c  -2+1 --> -1
c    ( b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧  p_309) -> ( b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0)
c  in CNF:
c    -b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨  b^{3, 104}_2
c    -b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_1
c    -b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨  b^{3, 104}_0
c  in DIMACS:
-6698 -6699  6700 -309  6701 0
-6698 -6699  6700 -309 -6702 0
-6698 -6699  6700 -309  6703 0

c  -1+1 --> 0
c    ( b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0 ∧  p_309) -> (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧ -b^{3, 104}_0)
c  in CNF:
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_2
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_1
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_0
c  in DIMACS:
-6698  6699 -6700 -309 -6701 0
-6698  6699 -6700 -309 -6702 0
-6698  6699 -6700 -309 -6703 0

c  0+1 --> 1
c    (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧  p_309) -> (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0)
c  in CNF:
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_2
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_1
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨  b^{3, 104}_0
c  in DIMACS:
 6698  6699  6700 -309 -6701 0
 6698  6699  6700 -309 -6702 0
 6698  6699  6700 -309  6703 0

c  1+1 --> 2
c    (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0 ∧  p_309) -> (-b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0)
c  in CNF:
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_2
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨  b^{3, 104}_1
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ -p_309 ∨ -b^{3, 104}_0
c  in DIMACS:
 6698  6699 -6700 -309 -6701 0
 6698  6699 -6700 -309  6702 0
 6698  6699 -6700 -309 -6703 0

c  2+1 --> break 
c    (-b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧  p_309) -> break
c  in CNF:
c     b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ -p_309 ∨ break
c  in DIMACS:
 6698 -6699  6700 -309 1162 0


c  2-1 --> 1
c    (-b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧ -p_309) -> (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0)
c  in CNF:
c     b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_2
c     b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_1
c     b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨  b^{3, 104}_0
c  in DIMACS:
 6698 -6699  6700  309 -6701 0
 6698 -6699  6700  309 -6702 0
 6698 -6699  6700  309  6703 0

c  1-1 --> 0
c    (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0 ∧ -p_309) -> (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧ -b^{3, 104}_0)
c  in CNF:
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_2
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_1
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_0
c  in DIMACS:
 6698  6699 -6700  309 -6701 0
 6698  6699 -6700  309 -6702 0
 6698  6699 -6700  309 -6703 0

c  0-1 --> -1
c    (-b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧ -p_309) -> ( b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0)
c  in CNF:
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨  b^{3, 104}_2
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_1
c     b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨  b^{3, 104}_0
c  in DIMACS:
 6698  6699  6700  309  6701 0
 6698  6699  6700  309 -6702 0
 6698  6699  6700  309  6703 0

c  -1-1 --> -2
c    ( b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧  b^{3, 103}_0 ∧ -p_309) -> ( b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0)
c  in CNF:
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨  b^{3, 104}_2
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨  b^{3, 104}_1
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨  p_309 ∨ -b^{3, 104}_0
c  in DIMACS:
-6698  6699 -6700  309  6701 0
-6698  6699 -6700  309  6702 0
-6698  6699 -6700  309 -6703 0

c  -2-1 --> break 
c    ( b^{3, 103}_2 ∧  b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧ -p_309) -> break
c  in CNF:
c    -b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨  b^{3, 103}_0 ∨  p_309 ∨ break
c  in DIMACS:
-6698 -6699  6700  309 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 103}_2 ∧ -b^{3, 103}_1 ∧ -b^{3, 103}_0 ∧ true) 
c  in CNF:
c    -b^{3, 103}_2 ∨  b^{3, 103}_1 ∨  b^{3, 103}_0 ∨ false 
c  in DIMACS:
-6698  6699  6700  0

c  3 does not represent an automaton state.
c    -(-b^{3, 103}_2 ∧  b^{3, 103}_1 ∧  b^{3, 103}_0 ∧ true) 
c  in CNF:
c     b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ false 
c  in DIMACS:
 6698 -6699 -6700  0
c  -3 does not represent an automaton state.
c    -( b^{3, 103}_2 ∧  b^{3, 103}_1 ∧  b^{3, 103}_0 ∧ true) 
c  in CNF:
c    -b^{3, 103}_2 ∨ -b^{3, 103}_1 ∨ -b^{3, 103}_0 ∨ false 
c  in DIMACS:
-6698 -6699 -6700  0

c i = 104
c  -2+1 --> -1
c    ( b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧  p_312) -> ( b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0)
c  in CNF:
c    -b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨  b^{3, 105}_2
c    -b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_1
c    -b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨  b^{3, 105}_0
c  in DIMACS:
-6701 -6702  6703 -312  6704 0
-6701 -6702  6703 -312 -6705 0
-6701 -6702  6703 -312  6706 0

c  -1+1 --> 0
c    ( b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0 ∧  p_312) -> (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧ -b^{3, 105}_0)
c  in CNF:
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_2
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_1
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_0
c  in DIMACS:
-6701  6702 -6703 -312 -6704 0
-6701  6702 -6703 -312 -6705 0
-6701  6702 -6703 -312 -6706 0

c  0+1 --> 1
c    (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧  p_312) -> (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0)
c  in CNF:
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_2
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_1
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨  b^{3, 105}_0
c  in DIMACS:
 6701  6702  6703 -312 -6704 0
 6701  6702  6703 -312 -6705 0
 6701  6702  6703 -312  6706 0

c  1+1 --> 2
c    (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0 ∧  p_312) -> (-b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0)
c  in CNF:
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_2
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨  b^{3, 105}_1
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ -p_312 ∨ -b^{3, 105}_0
c  in DIMACS:
 6701  6702 -6703 -312 -6704 0
 6701  6702 -6703 -312  6705 0
 6701  6702 -6703 -312 -6706 0

c  2+1 --> break 
c    (-b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧  p_312) -> break
c  in CNF:
c     b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 6701 -6702  6703 -312 1162 0


c  2-1 --> 1
c    (-b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧ -p_312) -> (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0)
c  in CNF:
c     b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_2
c     b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_1
c     b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨  b^{3, 105}_0
c  in DIMACS:
 6701 -6702  6703  312 -6704 0
 6701 -6702  6703  312 -6705 0
 6701 -6702  6703  312  6706 0

c  1-1 --> 0
c    (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0 ∧ -p_312) -> (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧ -b^{3, 105}_0)
c  in CNF:
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_2
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_1
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_0
c  in DIMACS:
 6701  6702 -6703  312 -6704 0
 6701  6702 -6703  312 -6705 0
 6701  6702 -6703  312 -6706 0

c  0-1 --> -1
c    (-b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧ -p_312) -> ( b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0)
c  in CNF:
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨  b^{3, 105}_2
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_1
c     b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨  b^{3, 105}_0
c  in DIMACS:
 6701  6702  6703  312  6704 0
 6701  6702  6703  312 -6705 0
 6701  6702  6703  312  6706 0

c  -1-1 --> -2
c    ( b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧  b^{3, 104}_0 ∧ -p_312) -> ( b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0)
c  in CNF:
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨  b^{3, 105}_2
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨  b^{3, 105}_1
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨  p_312 ∨ -b^{3, 105}_0
c  in DIMACS:
-6701  6702 -6703  312  6704 0
-6701  6702 -6703  312  6705 0
-6701  6702 -6703  312 -6706 0

c  -2-1 --> break 
c    ( b^{3, 104}_2 ∧  b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨  b^{3, 104}_0 ∨  p_312 ∨ break
c  in DIMACS:
-6701 -6702  6703  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 104}_2 ∧ -b^{3, 104}_1 ∧ -b^{3, 104}_0 ∧ true) 
c  in CNF:
c    -b^{3, 104}_2 ∨  b^{3, 104}_1 ∨  b^{3, 104}_0 ∨ false 
c  in DIMACS:
-6701  6702  6703  0

c  3 does not represent an automaton state.
c    -(-b^{3, 104}_2 ∧  b^{3, 104}_1 ∧  b^{3, 104}_0 ∧ true) 
c  in CNF:
c     b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ false 
c  in DIMACS:
 6701 -6702 -6703  0
c  -3 does not represent an automaton state.
c    -( b^{3, 104}_2 ∧  b^{3, 104}_1 ∧  b^{3, 104}_0 ∧ true) 
c  in CNF:
c    -b^{3, 104}_2 ∨ -b^{3, 104}_1 ∨ -b^{3, 104}_0 ∨ false 
c  in DIMACS:
-6701 -6702 -6703  0

c i = 105
c  -2+1 --> -1
c    ( b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧  p_315) -> ( b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0)
c  in CNF:
c    -b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨  b^{3, 106}_2
c    -b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_1
c    -b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨  b^{3, 106}_0
c  in DIMACS:
-6704 -6705  6706 -315  6707 0
-6704 -6705  6706 -315 -6708 0
-6704 -6705  6706 -315  6709 0

c  -1+1 --> 0
c    ( b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0 ∧  p_315) -> (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧ -b^{3, 106}_0)
c  in CNF:
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_2
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_1
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_0
c  in DIMACS:
-6704  6705 -6706 -315 -6707 0
-6704  6705 -6706 -315 -6708 0
-6704  6705 -6706 -315 -6709 0

c  0+1 --> 1
c    (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧  p_315) -> (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0)
c  in CNF:
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_2
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_1
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨  b^{3, 106}_0
c  in DIMACS:
 6704  6705  6706 -315 -6707 0
 6704  6705  6706 -315 -6708 0
 6704  6705  6706 -315  6709 0

c  1+1 --> 2
c    (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0 ∧  p_315) -> (-b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0)
c  in CNF:
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_2
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨  b^{3, 106}_1
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ -p_315 ∨ -b^{3, 106}_0
c  in DIMACS:
 6704  6705 -6706 -315 -6707 0
 6704  6705 -6706 -315  6708 0
 6704  6705 -6706 -315 -6709 0

c  2+1 --> break 
c    (-b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧  p_315) -> break
c  in CNF:
c     b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 6704 -6705  6706 -315 1162 0


c  2-1 --> 1
c    (-b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧ -p_315) -> (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0)
c  in CNF:
c     b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_2
c     b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_1
c     b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨  b^{3, 106}_0
c  in DIMACS:
 6704 -6705  6706  315 -6707 0
 6704 -6705  6706  315 -6708 0
 6704 -6705  6706  315  6709 0

c  1-1 --> 0
c    (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0 ∧ -p_315) -> (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧ -b^{3, 106}_0)
c  in CNF:
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_2
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_1
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_0
c  in DIMACS:
 6704  6705 -6706  315 -6707 0
 6704  6705 -6706  315 -6708 0
 6704  6705 -6706  315 -6709 0

c  0-1 --> -1
c    (-b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧ -p_315) -> ( b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0)
c  in CNF:
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨  b^{3, 106}_2
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_1
c     b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨  b^{3, 106}_0
c  in DIMACS:
 6704  6705  6706  315  6707 0
 6704  6705  6706  315 -6708 0
 6704  6705  6706  315  6709 0

c  -1-1 --> -2
c    ( b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧  b^{3, 105}_0 ∧ -p_315) -> ( b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0)
c  in CNF:
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨  b^{3, 106}_2
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨  b^{3, 106}_1
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨  p_315 ∨ -b^{3, 106}_0
c  in DIMACS:
-6704  6705 -6706  315  6707 0
-6704  6705 -6706  315  6708 0
-6704  6705 -6706  315 -6709 0

c  -2-1 --> break 
c    ( b^{3, 105}_2 ∧  b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨  b^{3, 105}_0 ∨  p_315 ∨ break
c  in DIMACS:
-6704 -6705  6706  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 105}_2 ∧ -b^{3, 105}_1 ∧ -b^{3, 105}_0 ∧ true) 
c  in CNF:
c    -b^{3, 105}_2 ∨  b^{3, 105}_1 ∨  b^{3, 105}_0 ∨ false 
c  in DIMACS:
-6704  6705  6706  0

c  3 does not represent an automaton state.
c    -(-b^{3, 105}_2 ∧  b^{3, 105}_1 ∧  b^{3, 105}_0 ∧ true) 
c  in CNF:
c     b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ false 
c  in DIMACS:
 6704 -6705 -6706  0
c  -3 does not represent an automaton state.
c    -( b^{3, 105}_2 ∧  b^{3, 105}_1 ∧  b^{3, 105}_0 ∧ true) 
c  in CNF:
c    -b^{3, 105}_2 ∨ -b^{3, 105}_1 ∨ -b^{3, 105}_0 ∨ false 
c  in DIMACS:
-6704 -6705 -6706  0

c i = 106
c  -2+1 --> -1
c    ( b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧  p_318) -> ( b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0)
c  in CNF:
c    -b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨  b^{3, 107}_2
c    -b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_1
c    -b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨  b^{3, 107}_0
c  in DIMACS:
-6707 -6708  6709 -318  6710 0
-6707 -6708  6709 -318 -6711 0
-6707 -6708  6709 -318  6712 0

c  -1+1 --> 0
c    ( b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0 ∧  p_318) -> (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧ -b^{3, 107}_0)
c  in CNF:
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_2
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_1
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_0
c  in DIMACS:
-6707  6708 -6709 -318 -6710 0
-6707  6708 -6709 -318 -6711 0
-6707  6708 -6709 -318 -6712 0

c  0+1 --> 1
c    (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧  p_318) -> (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0)
c  in CNF:
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_2
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_1
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨  b^{3, 107}_0
c  in DIMACS:
 6707  6708  6709 -318 -6710 0
 6707  6708  6709 -318 -6711 0
 6707  6708  6709 -318  6712 0

c  1+1 --> 2
c    (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0 ∧  p_318) -> (-b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0)
c  in CNF:
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_2
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨  b^{3, 107}_1
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ -p_318 ∨ -b^{3, 107}_0
c  in DIMACS:
 6707  6708 -6709 -318 -6710 0
 6707  6708 -6709 -318  6711 0
 6707  6708 -6709 -318 -6712 0

c  2+1 --> break 
c    (-b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧  p_318) -> break
c  in CNF:
c     b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 6707 -6708  6709 -318 1162 0


c  2-1 --> 1
c    (-b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧ -p_318) -> (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0)
c  in CNF:
c     b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_2
c     b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_1
c     b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨  b^{3, 107}_0
c  in DIMACS:
 6707 -6708  6709  318 -6710 0
 6707 -6708  6709  318 -6711 0
 6707 -6708  6709  318  6712 0

c  1-1 --> 0
c    (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0 ∧ -p_318) -> (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧ -b^{3, 107}_0)
c  in CNF:
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_2
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_1
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_0
c  in DIMACS:
 6707  6708 -6709  318 -6710 0
 6707  6708 -6709  318 -6711 0
 6707  6708 -6709  318 -6712 0

c  0-1 --> -1
c    (-b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧ -p_318) -> ( b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0)
c  in CNF:
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨  b^{3, 107}_2
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_1
c     b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨  b^{3, 107}_0
c  in DIMACS:
 6707  6708  6709  318  6710 0
 6707  6708  6709  318 -6711 0
 6707  6708  6709  318  6712 0

c  -1-1 --> -2
c    ( b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧  b^{3, 106}_0 ∧ -p_318) -> ( b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0)
c  in CNF:
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨  b^{3, 107}_2
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨  b^{3, 107}_1
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨  p_318 ∨ -b^{3, 107}_0
c  in DIMACS:
-6707  6708 -6709  318  6710 0
-6707  6708 -6709  318  6711 0
-6707  6708 -6709  318 -6712 0

c  -2-1 --> break 
c    ( b^{3, 106}_2 ∧  b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨  b^{3, 106}_0 ∨  p_318 ∨ break
c  in DIMACS:
-6707 -6708  6709  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 106}_2 ∧ -b^{3, 106}_1 ∧ -b^{3, 106}_0 ∧ true) 
c  in CNF:
c    -b^{3, 106}_2 ∨  b^{3, 106}_1 ∨  b^{3, 106}_0 ∨ false 
c  in DIMACS:
-6707  6708  6709  0

c  3 does not represent an automaton state.
c    -(-b^{3, 106}_2 ∧  b^{3, 106}_1 ∧  b^{3, 106}_0 ∧ true) 
c  in CNF:
c     b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ false 
c  in DIMACS:
 6707 -6708 -6709  0
c  -3 does not represent an automaton state.
c    -( b^{3, 106}_2 ∧  b^{3, 106}_1 ∧  b^{3, 106}_0 ∧ true) 
c  in CNF:
c    -b^{3, 106}_2 ∨ -b^{3, 106}_1 ∨ -b^{3, 106}_0 ∨ false 
c  in DIMACS:
-6707 -6708 -6709  0

c i = 107
c  -2+1 --> -1
c    ( b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧  p_321) -> ( b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0)
c  in CNF:
c    -b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨  b^{3, 108}_2
c    -b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_1
c    -b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨  b^{3, 108}_0
c  in DIMACS:
-6710 -6711  6712 -321  6713 0
-6710 -6711  6712 -321 -6714 0
-6710 -6711  6712 -321  6715 0

c  -1+1 --> 0
c    ( b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0 ∧  p_321) -> (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧ -b^{3, 108}_0)
c  in CNF:
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_2
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_1
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_0
c  in DIMACS:
-6710  6711 -6712 -321 -6713 0
-6710  6711 -6712 -321 -6714 0
-6710  6711 -6712 -321 -6715 0

c  0+1 --> 1
c    (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧  p_321) -> (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0)
c  in CNF:
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_2
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_1
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨  b^{3, 108}_0
c  in DIMACS:
 6710  6711  6712 -321 -6713 0
 6710  6711  6712 -321 -6714 0
 6710  6711  6712 -321  6715 0

c  1+1 --> 2
c    (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0 ∧  p_321) -> (-b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0)
c  in CNF:
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_2
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨  b^{3, 108}_1
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ -p_321 ∨ -b^{3, 108}_0
c  in DIMACS:
 6710  6711 -6712 -321 -6713 0
 6710  6711 -6712 -321  6714 0
 6710  6711 -6712 -321 -6715 0

c  2+1 --> break 
c    (-b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧  p_321) -> break
c  in CNF:
c     b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ -p_321 ∨ break
c  in DIMACS:
 6710 -6711  6712 -321 1162 0


c  2-1 --> 1
c    (-b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧ -p_321) -> (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0)
c  in CNF:
c     b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_2
c     b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_1
c     b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨  b^{3, 108}_0
c  in DIMACS:
 6710 -6711  6712  321 -6713 0
 6710 -6711  6712  321 -6714 0
 6710 -6711  6712  321  6715 0

c  1-1 --> 0
c    (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0 ∧ -p_321) -> (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧ -b^{3, 108}_0)
c  in CNF:
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_2
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_1
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_0
c  in DIMACS:
 6710  6711 -6712  321 -6713 0
 6710  6711 -6712  321 -6714 0
 6710  6711 -6712  321 -6715 0

c  0-1 --> -1
c    (-b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧ -p_321) -> ( b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0)
c  in CNF:
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨  b^{3, 108}_2
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_1
c     b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨  b^{3, 108}_0
c  in DIMACS:
 6710  6711  6712  321  6713 0
 6710  6711  6712  321 -6714 0
 6710  6711  6712  321  6715 0

c  -1-1 --> -2
c    ( b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧  b^{3, 107}_0 ∧ -p_321) -> ( b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0)
c  in CNF:
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨  b^{3, 108}_2
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨  b^{3, 108}_1
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨  p_321 ∨ -b^{3, 108}_0
c  in DIMACS:
-6710  6711 -6712  321  6713 0
-6710  6711 -6712  321  6714 0
-6710  6711 -6712  321 -6715 0

c  -2-1 --> break 
c    ( b^{3, 107}_2 ∧  b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧ -p_321) -> break
c  in CNF:
c    -b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨  b^{3, 107}_0 ∨  p_321 ∨ break
c  in DIMACS:
-6710 -6711  6712  321 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 107}_2 ∧ -b^{3, 107}_1 ∧ -b^{3, 107}_0 ∧ true) 
c  in CNF:
c    -b^{3, 107}_2 ∨  b^{3, 107}_1 ∨  b^{3, 107}_0 ∨ false 
c  in DIMACS:
-6710  6711  6712  0

c  3 does not represent an automaton state.
c    -(-b^{3, 107}_2 ∧  b^{3, 107}_1 ∧  b^{3, 107}_0 ∧ true) 
c  in CNF:
c     b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ false 
c  in DIMACS:
 6710 -6711 -6712  0
c  -3 does not represent an automaton state.
c    -( b^{3, 107}_2 ∧  b^{3, 107}_1 ∧  b^{3, 107}_0 ∧ true) 
c  in CNF:
c    -b^{3, 107}_2 ∨ -b^{3, 107}_1 ∨ -b^{3, 107}_0 ∨ false 
c  in DIMACS:
-6710 -6711 -6712  0

c i = 108
c  -2+1 --> -1
c    ( b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧  p_324) -> ( b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0)
c  in CNF:
c    -b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨  b^{3, 109}_2
c    -b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_1
c    -b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨  b^{3, 109}_0
c  in DIMACS:
-6713 -6714  6715 -324  6716 0
-6713 -6714  6715 -324 -6717 0
-6713 -6714  6715 -324  6718 0

c  -1+1 --> 0
c    ( b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0 ∧  p_324) -> (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧ -b^{3, 109}_0)
c  in CNF:
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_2
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_1
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_0
c  in DIMACS:
-6713  6714 -6715 -324 -6716 0
-6713  6714 -6715 -324 -6717 0
-6713  6714 -6715 -324 -6718 0

c  0+1 --> 1
c    (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧  p_324) -> (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0)
c  in CNF:
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_2
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_1
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨  b^{3, 109}_0
c  in DIMACS:
 6713  6714  6715 -324 -6716 0
 6713  6714  6715 -324 -6717 0
 6713  6714  6715 -324  6718 0

c  1+1 --> 2
c    (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0 ∧  p_324) -> (-b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0)
c  in CNF:
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_2
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨  b^{3, 109}_1
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ -p_324 ∨ -b^{3, 109}_0
c  in DIMACS:
 6713  6714 -6715 -324 -6716 0
 6713  6714 -6715 -324  6717 0
 6713  6714 -6715 -324 -6718 0

c  2+1 --> break 
c    (-b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧  p_324) -> break
c  in CNF:
c     b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 6713 -6714  6715 -324 1162 0


c  2-1 --> 1
c    (-b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧ -p_324) -> (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0)
c  in CNF:
c     b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_2
c     b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_1
c     b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨  b^{3, 109}_0
c  in DIMACS:
 6713 -6714  6715  324 -6716 0
 6713 -6714  6715  324 -6717 0
 6713 -6714  6715  324  6718 0

c  1-1 --> 0
c    (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0 ∧ -p_324) -> (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧ -b^{3, 109}_0)
c  in CNF:
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_2
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_1
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_0
c  in DIMACS:
 6713  6714 -6715  324 -6716 0
 6713  6714 -6715  324 -6717 0
 6713  6714 -6715  324 -6718 0

c  0-1 --> -1
c    (-b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧ -p_324) -> ( b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0)
c  in CNF:
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨  b^{3, 109}_2
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_1
c     b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨  b^{3, 109}_0
c  in DIMACS:
 6713  6714  6715  324  6716 0
 6713  6714  6715  324 -6717 0
 6713  6714  6715  324  6718 0

c  -1-1 --> -2
c    ( b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧  b^{3, 108}_0 ∧ -p_324) -> ( b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0)
c  in CNF:
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨  b^{3, 109}_2
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨  b^{3, 109}_1
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨  p_324 ∨ -b^{3, 109}_0
c  in DIMACS:
-6713  6714 -6715  324  6716 0
-6713  6714 -6715  324  6717 0
-6713  6714 -6715  324 -6718 0

c  -2-1 --> break 
c    ( b^{3, 108}_2 ∧  b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨  b^{3, 108}_0 ∨  p_324 ∨ break
c  in DIMACS:
-6713 -6714  6715  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 108}_2 ∧ -b^{3, 108}_1 ∧ -b^{3, 108}_0 ∧ true) 
c  in CNF:
c    -b^{3, 108}_2 ∨  b^{3, 108}_1 ∨  b^{3, 108}_0 ∨ false 
c  in DIMACS:
-6713  6714  6715  0

c  3 does not represent an automaton state.
c    -(-b^{3, 108}_2 ∧  b^{3, 108}_1 ∧  b^{3, 108}_0 ∧ true) 
c  in CNF:
c     b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ false 
c  in DIMACS:
 6713 -6714 -6715  0
c  -3 does not represent an automaton state.
c    -( b^{3, 108}_2 ∧  b^{3, 108}_1 ∧  b^{3, 108}_0 ∧ true) 
c  in CNF:
c    -b^{3, 108}_2 ∨ -b^{3, 108}_1 ∨ -b^{3, 108}_0 ∨ false 
c  in DIMACS:
-6713 -6714 -6715  0

c i = 109
c  -2+1 --> -1
c    ( b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧  p_327) -> ( b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0)
c  in CNF:
c    -b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨  b^{3, 110}_2
c    -b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_1
c    -b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨  b^{3, 110}_0
c  in DIMACS:
-6716 -6717  6718 -327  6719 0
-6716 -6717  6718 -327 -6720 0
-6716 -6717  6718 -327  6721 0

c  -1+1 --> 0
c    ( b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0 ∧  p_327) -> (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧ -b^{3, 110}_0)
c  in CNF:
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_2
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_1
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_0
c  in DIMACS:
-6716  6717 -6718 -327 -6719 0
-6716  6717 -6718 -327 -6720 0
-6716  6717 -6718 -327 -6721 0

c  0+1 --> 1
c    (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧  p_327) -> (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0)
c  in CNF:
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_2
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_1
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨  b^{3, 110}_0
c  in DIMACS:
 6716  6717  6718 -327 -6719 0
 6716  6717  6718 -327 -6720 0
 6716  6717  6718 -327  6721 0

c  1+1 --> 2
c    (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0 ∧  p_327) -> (-b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0)
c  in CNF:
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_2
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨  b^{3, 110}_1
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ -p_327 ∨ -b^{3, 110}_0
c  in DIMACS:
 6716  6717 -6718 -327 -6719 0
 6716  6717 -6718 -327  6720 0
 6716  6717 -6718 -327 -6721 0

c  2+1 --> break 
c    (-b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧  p_327) -> break
c  in CNF:
c     b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ -p_327 ∨ break
c  in DIMACS:
 6716 -6717  6718 -327 1162 0


c  2-1 --> 1
c    (-b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧ -p_327) -> (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0)
c  in CNF:
c     b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_2
c     b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_1
c     b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨  b^{3, 110}_0
c  in DIMACS:
 6716 -6717  6718  327 -6719 0
 6716 -6717  6718  327 -6720 0
 6716 -6717  6718  327  6721 0

c  1-1 --> 0
c    (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0 ∧ -p_327) -> (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧ -b^{3, 110}_0)
c  in CNF:
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_2
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_1
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_0
c  in DIMACS:
 6716  6717 -6718  327 -6719 0
 6716  6717 -6718  327 -6720 0
 6716  6717 -6718  327 -6721 0

c  0-1 --> -1
c    (-b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧ -p_327) -> ( b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0)
c  in CNF:
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨  b^{3, 110}_2
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_1
c     b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨  b^{3, 110}_0
c  in DIMACS:
 6716  6717  6718  327  6719 0
 6716  6717  6718  327 -6720 0
 6716  6717  6718  327  6721 0

c  -1-1 --> -2
c    ( b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧  b^{3, 109}_0 ∧ -p_327) -> ( b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0)
c  in CNF:
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨  b^{3, 110}_2
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨  b^{3, 110}_1
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨  p_327 ∨ -b^{3, 110}_0
c  in DIMACS:
-6716  6717 -6718  327  6719 0
-6716  6717 -6718  327  6720 0
-6716  6717 -6718  327 -6721 0

c  -2-1 --> break 
c    ( b^{3, 109}_2 ∧  b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧ -p_327) -> break
c  in CNF:
c    -b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨  b^{3, 109}_0 ∨  p_327 ∨ break
c  in DIMACS:
-6716 -6717  6718  327 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 109}_2 ∧ -b^{3, 109}_1 ∧ -b^{3, 109}_0 ∧ true) 
c  in CNF:
c    -b^{3, 109}_2 ∨  b^{3, 109}_1 ∨  b^{3, 109}_0 ∨ false 
c  in DIMACS:
-6716  6717  6718  0

c  3 does not represent an automaton state.
c    -(-b^{3, 109}_2 ∧  b^{3, 109}_1 ∧  b^{3, 109}_0 ∧ true) 
c  in CNF:
c     b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ false 
c  in DIMACS:
 6716 -6717 -6718  0
c  -3 does not represent an automaton state.
c    -( b^{3, 109}_2 ∧  b^{3, 109}_1 ∧  b^{3, 109}_0 ∧ true) 
c  in CNF:
c    -b^{3, 109}_2 ∨ -b^{3, 109}_1 ∨ -b^{3, 109}_0 ∨ false 
c  in DIMACS:
-6716 -6717 -6718  0

c i = 110
c  -2+1 --> -1
c    ( b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧  p_330) -> ( b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0)
c  in CNF:
c    -b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨  b^{3, 111}_2
c    -b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_1
c    -b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨  b^{3, 111}_0
c  in DIMACS:
-6719 -6720  6721 -330  6722 0
-6719 -6720  6721 -330 -6723 0
-6719 -6720  6721 -330  6724 0

c  -1+1 --> 0
c    ( b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0 ∧  p_330) -> (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧ -b^{3, 111}_0)
c  in CNF:
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_2
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_1
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_0
c  in DIMACS:
-6719  6720 -6721 -330 -6722 0
-6719  6720 -6721 -330 -6723 0
-6719  6720 -6721 -330 -6724 0

c  0+1 --> 1
c    (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧  p_330) -> (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0)
c  in CNF:
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_2
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_1
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨  b^{3, 111}_0
c  in DIMACS:
 6719  6720  6721 -330 -6722 0
 6719  6720  6721 -330 -6723 0
 6719  6720  6721 -330  6724 0

c  1+1 --> 2
c    (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0 ∧  p_330) -> (-b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0)
c  in CNF:
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_2
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨  b^{3, 111}_1
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ -p_330 ∨ -b^{3, 111}_0
c  in DIMACS:
 6719  6720 -6721 -330 -6722 0
 6719  6720 -6721 -330  6723 0
 6719  6720 -6721 -330 -6724 0

c  2+1 --> break 
c    (-b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧  p_330) -> break
c  in CNF:
c     b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 6719 -6720  6721 -330 1162 0


c  2-1 --> 1
c    (-b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧ -p_330) -> (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0)
c  in CNF:
c     b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_2
c     b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_1
c     b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨  b^{3, 111}_0
c  in DIMACS:
 6719 -6720  6721  330 -6722 0
 6719 -6720  6721  330 -6723 0
 6719 -6720  6721  330  6724 0

c  1-1 --> 0
c    (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0 ∧ -p_330) -> (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧ -b^{3, 111}_0)
c  in CNF:
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_2
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_1
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_0
c  in DIMACS:
 6719  6720 -6721  330 -6722 0
 6719  6720 -6721  330 -6723 0
 6719  6720 -6721  330 -6724 0

c  0-1 --> -1
c    (-b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧ -p_330) -> ( b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0)
c  in CNF:
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨  b^{3, 111}_2
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_1
c     b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨  b^{3, 111}_0
c  in DIMACS:
 6719  6720  6721  330  6722 0
 6719  6720  6721  330 -6723 0
 6719  6720  6721  330  6724 0

c  -1-1 --> -2
c    ( b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧  b^{3, 110}_0 ∧ -p_330) -> ( b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0)
c  in CNF:
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨  b^{3, 111}_2
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨  b^{3, 111}_1
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨  p_330 ∨ -b^{3, 111}_0
c  in DIMACS:
-6719  6720 -6721  330  6722 0
-6719  6720 -6721  330  6723 0
-6719  6720 -6721  330 -6724 0

c  -2-1 --> break 
c    ( b^{3, 110}_2 ∧  b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨  b^{3, 110}_0 ∨  p_330 ∨ break
c  in DIMACS:
-6719 -6720  6721  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 110}_2 ∧ -b^{3, 110}_1 ∧ -b^{3, 110}_0 ∧ true) 
c  in CNF:
c    -b^{3, 110}_2 ∨  b^{3, 110}_1 ∨  b^{3, 110}_0 ∨ false 
c  in DIMACS:
-6719  6720  6721  0

c  3 does not represent an automaton state.
c    -(-b^{3, 110}_2 ∧  b^{3, 110}_1 ∧  b^{3, 110}_0 ∧ true) 
c  in CNF:
c     b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ false 
c  in DIMACS:
 6719 -6720 -6721  0
c  -3 does not represent an automaton state.
c    -( b^{3, 110}_2 ∧  b^{3, 110}_1 ∧  b^{3, 110}_0 ∧ true) 
c  in CNF:
c    -b^{3, 110}_2 ∨ -b^{3, 110}_1 ∨ -b^{3, 110}_0 ∨ false 
c  in DIMACS:
-6719 -6720 -6721  0

c i = 111
c  -2+1 --> -1
c    ( b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧  p_333) -> ( b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0)
c  in CNF:
c    -b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨  b^{3, 112}_2
c    -b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_1
c    -b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨  b^{3, 112}_0
c  in DIMACS:
-6722 -6723  6724 -333  6725 0
-6722 -6723  6724 -333 -6726 0
-6722 -6723  6724 -333  6727 0

c  -1+1 --> 0
c    ( b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0 ∧  p_333) -> (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧ -b^{3, 112}_0)
c  in CNF:
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_2
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_1
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_0
c  in DIMACS:
-6722  6723 -6724 -333 -6725 0
-6722  6723 -6724 -333 -6726 0
-6722  6723 -6724 -333 -6727 0

c  0+1 --> 1
c    (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧  p_333) -> (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0)
c  in CNF:
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_2
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_1
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨  b^{3, 112}_0
c  in DIMACS:
 6722  6723  6724 -333 -6725 0
 6722  6723  6724 -333 -6726 0
 6722  6723  6724 -333  6727 0

c  1+1 --> 2
c    (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0 ∧  p_333) -> (-b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0)
c  in CNF:
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_2
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨  b^{3, 112}_1
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ -p_333 ∨ -b^{3, 112}_0
c  in DIMACS:
 6722  6723 -6724 -333 -6725 0
 6722  6723 -6724 -333  6726 0
 6722  6723 -6724 -333 -6727 0

c  2+1 --> break 
c    (-b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧  p_333) -> break
c  in CNF:
c     b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 6722 -6723  6724 -333 1162 0


c  2-1 --> 1
c    (-b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧ -p_333) -> (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0)
c  in CNF:
c     b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_2
c     b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_1
c     b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨  b^{3, 112}_0
c  in DIMACS:
 6722 -6723  6724  333 -6725 0
 6722 -6723  6724  333 -6726 0
 6722 -6723  6724  333  6727 0

c  1-1 --> 0
c    (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0 ∧ -p_333) -> (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧ -b^{3, 112}_0)
c  in CNF:
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_2
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_1
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_0
c  in DIMACS:
 6722  6723 -6724  333 -6725 0
 6722  6723 -6724  333 -6726 0
 6722  6723 -6724  333 -6727 0

c  0-1 --> -1
c    (-b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧ -p_333) -> ( b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0)
c  in CNF:
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨  b^{3, 112}_2
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_1
c     b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨  b^{3, 112}_0
c  in DIMACS:
 6722  6723  6724  333  6725 0
 6722  6723  6724  333 -6726 0
 6722  6723  6724  333  6727 0

c  -1-1 --> -2
c    ( b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧  b^{3, 111}_0 ∧ -p_333) -> ( b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0)
c  in CNF:
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨  b^{3, 112}_2
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨  b^{3, 112}_1
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨  p_333 ∨ -b^{3, 112}_0
c  in DIMACS:
-6722  6723 -6724  333  6725 0
-6722  6723 -6724  333  6726 0
-6722  6723 -6724  333 -6727 0

c  -2-1 --> break 
c    ( b^{3, 111}_2 ∧  b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨  b^{3, 111}_0 ∨  p_333 ∨ break
c  in DIMACS:
-6722 -6723  6724  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 111}_2 ∧ -b^{3, 111}_1 ∧ -b^{3, 111}_0 ∧ true) 
c  in CNF:
c    -b^{3, 111}_2 ∨  b^{3, 111}_1 ∨  b^{3, 111}_0 ∨ false 
c  in DIMACS:
-6722  6723  6724  0

c  3 does not represent an automaton state.
c    -(-b^{3, 111}_2 ∧  b^{3, 111}_1 ∧  b^{3, 111}_0 ∧ true) 
c  in CNF:
c     b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ false 
c  in DIMACS:
 6722 -6723 -6724  0
c  -3 does not represent an automaton state.
c    -( b^{3, 111}_2 ∧  b^{3, 111}_1 ∧  b^{3, 111}_0 ∧ true) 
c  in CNF:
c    -b^{3, 111}_2 ∨ -b^{3, 111}_1 ∨ -b^{3, 111}_0 ∨ false 
c  in DIMACS:
-6722 -6723 -6724  0

c i = 112
c  -2+1 --> -1
c    ( b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧  p_336) -> ( b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0)
c  in CNF:
c    -b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨  b^{3, 113}_2
c    -b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_1
c    -b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨  b^{3, 113}_0
c  in DIMACS:
-6725 -6726  6727 -336  6728 0
-6725 -6726  6727 -336 -6729 0
-6725 -6726  6727 -336  6730 0

c  -1+1 --> 0
c    ( b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0 ∧  p_336) -> (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧ -b^{3, 113}_0)
c  in CNF:
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_2
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_1
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_0
c  in DIMACS:
-6725  6726 -6727 -336 -6728 0
-6725  6726 -6727 -336 -6729 0
-6725  6726 -6727 -336 -6730 0

c  0+1 --> 1
c    (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧  p_336) -> (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0)
c  in CNF:
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_2
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_1
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨  b^{3, 113}_0
c  in DIMACS:
 6725  6726  6727 -336 -6728 0
 6725  6726  6727 -336 -6729 0
 6725  6726  6727 -336  6730 0

c  1+1 --> 2
c    (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0 ∧  p_336) -> (-b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0)
c  in CNF:
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_2
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨  b^{3, 113}_1
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ -p_336 ∨ -b^{3, 113}_0
c  in DIMACS:
 6725  6726 -6727 -336 -6728 0
 6725  6726 -6727 -336  6729 0
 6725  6726 -6727 -336 -6730 0

c  2+1 --> break 
c    (-b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧  p_336) -> break
c  in CNF:
c     b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 6725 -6726  6727 -336 1162 0


c  2-1 --> 1
c    (-b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧ -p_336) -> (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0)
c  in CNF:
c     b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_2
c     b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_1
c     b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨  b^{3, 113}_0
c  in DIMACS:
 6725 -6726  6727  336 -6728 0
 6725 -6726  6727  336 -6729 0
 6725 -6726  6727  336  6730 0

c  1-1 --> 0
c    (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0 ∧ -p_336) -> (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧ -b^{3, 113}_0)
c  in CNF:
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_2
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_1
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_0
c  in DIMACS:
 6725  6726 -6727  336 -6728 0
 6725  6726 -6727  336 -6729 0
 6725  6726 -6727  336 -6730 0

c  0-1 --> -1
c    (-b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧ -p_336) -> ( b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0)
c  in CNF:
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨  b^{3, 113}_2
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_1
c     b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨  b^{3, 113}_0
c  in DIMACS:
 6725  6726  6727  336  6728 0
 6725  6726  6727  336 -6729 0
 6725  6726  6727  336  6730 0

c  -1-1 --> -2
c    ( b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧  b^{3, 112}_0 ∧ -p_336) -> ( b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0)
c  in CNF:
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨  b^{3, 113}_2
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨  b^{3, 113}_1
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨  p_336 ∨ -b^{3, 113}_0
c  in DIMACS:
-6725  6726 -6727  336  6728 0
-6725  6726 -6727  336  6729 0
-6725  6726 -6727  336 -6730 0

c  -2-1 --> break 
c    ( b^{3, 112}_2 ∧  b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨  b^{3, 112}_0 ∨  p_336 ∨ break
c  in DIMACS:
-6725 -6726  6727  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 112}_2 ∧ -b^{3, 112}_1 ∧ -b^{3, 112}_0 ∧ true) 
c  in CNF:
c    -b^{3, 112}_2 ∨  b^{3, 112}_1 ∨  b^{3, 112}_0 ∨ false 
c  in DIMACS:
-6725  6726  6727  0

c  3 does not represent an automaton state.
c    -(-b^{3, 112}_2 ∧  b^{3, 112}_1 ∧  b^{3, 112}_0 ∧ true) 
c  in CNF:
c     b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ false 
c  in DIMACS:
 6725 -6726 -6727  0
c  -3 does not represent an automaton state.
c    -( b^{3, 112}_2 ∧  b^{3, 112}_1 ∧  b^{3, 112}_0 ∧ true) 
c  in CNF:
c    -b^{3, 112}_2 ∨ -b^{3, 112}_1 ∨ -b^{3, 112}_0 ∨ false 
c  in DIMACS:
-6725 -6726 -6727  0

c i = 113
c  -2+1 --> -1
c    ( b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧  p_339) -> ( b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0)
c  in CNF:
c    -b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨  b^{3, 114}_2
c    -b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_1
c    -b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨  b^{3, 114}_0
c  in DIMACS:
-6728 -6729  6730 -339  6731 0
-6728 -6729  6730 -339 -6732 0
-6728 -6729  6730 -339  6733 0

c  -1+1 --> 0
c    ( b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0 ∧  p_339) -> (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧ -b^{3, 114}_0)
c  in CNF:
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_2
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_1
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_0
c  in DIMACS:
-6728  6729 -6730 -339 -6731 0
-6728  6729 -6730 -339 -6732 0
-6728  6729 -6730 -339 -6733 0

c  0+1 --> 1
c    (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧  p_339) -> (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0)
c  in CNF:
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_2
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_1
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨  b^{3, 114}_0
c  in DIMACS:
 6728  6729  6730 -339 -6731 0
 6728  6729  6730 -339 -6732 0
 6728  6729  6730 -339  6733 0

c  1+1 --> 2
c    (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0 ∧  p_339) -> (-b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0)
c  in CNF:
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_2
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨  b^{3, 114}_1
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ -p_339 ∨ -b^{3, 114}_0
c  in DIMACS:
 6728  6729 -6730 -339 -6731 0
 6728  6729 -6730 -339  6732 0
 6728  6729 -6730 -339 -6733 0

c  2+1 --> break 
c    (-b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧  p_339) -> break
c  in CNF:
c     b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ -p_339 ∨ break
c  in DIMACS:
 6728 -6729  6730 -339 1162 0


c  2-1 --> 1
c    (-b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧ -p_339) -> (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0)
c  in CNF:
c     b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_2
c     b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_1
c     b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨  b^{3, 114}_0
c  in DIMACS:
 6728 -6729  6730  339 -6731 0
 6728 -6729  6730  339 -6732 0
 6728 -6729  6730  339  6733 0

c  1-1 --> 0
c    (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0 ∧ -p_339) -> (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧ -b^{3, 114}_0)
c  in CNF:
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_2
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_1
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_0
c  in DIMACS:
 6728  6729 -6730  339 -6731 0
 6728  6729 -6730  339 -6732 0
 6728  6729 -6730  339 -6733 0

c  0-1 --> -1
c    (-b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧ -p_339) -> ( b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0)
c  in CNF:
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨  b^{3, 114}_2
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_1
c     b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨  b^{3, 114}_0
c  in DIMACS:
 6728  6729  6730  339  6731 0
 6728  6729  6730  339 -6732 0
 6728  6729  6730  339  6733 0

c  -1-1 --> -2
c    ( b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧  b^{3, 113}_0 ∧ -p_339) -> ( b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0)
c  in CNF:
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨  b^{3, 114}_2
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨  b^{3, 114}_1
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨  p_339 ∨ -b^{3, 114}_0
c  in DIMACS:
-6728  6729 -6730  339  6731 0
-6728  6729 -6730  339  6732 0
-6728  6729 -6730  339 -6733 0

c  -2-1 --> break 
c    ( b^{3, 113}_2 ∧  b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧ -p_339) -> break
c  in CNF:
c    -b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨  b^{3, 113}_0 ∨  p_339 ∨ break
c  in DIMACS:
-6728 -6729  6730  339 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 113}_2 ∧ -b^{3, 113}_1 ∧ -b^{3, 113}_0 ∧ true) 
c  in CNF:
c    -b^{3, 113}_2 ∨  b^{3, 113}_1 ∨  b^{3, 113}_0 ∨ false 
c  in DIMACS:
-6728  6729  6730  0

c  3 does not represent an automaton state.
c    -(-b^{3, 113}_2 ∧  b^{3, 113}_1 ∧  b^{3, 113}_0 ∧ true) 
c  in CNF:
c     b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ false 
c  in DIMACS:
 6728 -6729 -6730  0
c  -3 does not represent an automaton state.
c    -( b^{3, 113}_2 ∧  b^{3, 113}_1 ∧  b^{3, 113}_0 ∧ true) 
c  in CNF:
c    -b^{3, 113}_2 ∨ -b^{3, 113}_1 ∨ -b^{3, 113}_0 ∨ false 
c  in DIMACS:
-6728 -6729 -6730  0

c i = 114
c  -2+1 --> -1
c    ( b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧  p_342) -> ( b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0)
c  in CNF:
c    -b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨  b^{3, 115}_2
c    -b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_1
c    -b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨  b^{3, 115}_0
c  in DIMACS:
-6731 -6732  6733 -342  6734 0
-6731 -6732  6733 -342 -6735 0
-6731 -6732  6733 -342  6736 0

c  -1+1 --> 0
c    ( b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0 ∧  p_342) -> (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧ -b^{3, 115}_0)
c  in CNF:
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_2
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_1
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_0
c  in DIMACS:
-6731  6732 -6733 -342 -6734 0
-6731  6732 -6733 -342 -6735 0
-6731  6732 -6733 -342 -6736 0

c  0+1 --> 1
c    (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧  p_342) -> (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0)
c  in CNF:
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_2
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_1
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨  b^{3, 115}_0
c  in DIMACS:
 6731  6732  6733 -342 -6734 0
 6731  6732  6733 -342 -6735 0
 6731  6732  6733 -342  6736 0

c  1+1 --> 2
c    (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0 ∧  p_342) -> (-b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0)
c  in CNF:
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_2
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨  b^{3, 115}_1
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ -p_342 ∨ -b^{3, 115}_0
c  in DIMACS:
 6731  6732 -6733 -342 -6734 0
 6731  6732 -6733 -342  6735 0
 6731  6732 -6733 -342 -6736 0

c  2+1 --> break 
c    (-b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧  p_342) -> break
c  in CNF:
c     b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 6731 -6732  6733 -342 1162 0


c  2-1 --> 1
c    (-b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧ -p_342) -> (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0)
c  in CNF:
c     b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_2
c     b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_1
c     b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨  b^{3, 115}_0
c  in DIMACS:
 6731 -6732  6733  342 -6734 0
 6731 -6732  6733  342 -6735 0
 6731 -6732  6733  342  6736 0

c  1-1 --> 0
c    (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0 ∧ -p_342) -> (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧ -b^{3, 115}_0)
c  in CNF:
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_2
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_1
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_0
c  in DIMACS:
 6731  6732 -6733  342 -6734 0
 6731  6732 -6733  342 -6735 0
 6731  6732 -6733  342 -6736 0

c  0-1 --> -1
c    (-b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧ -p_342) -> ( b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0)
c  in CNF:
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨  b^{3, 115}_2
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_1
c     b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨  b^{3, 115}_0
c  in DIMACS:
 6731  6732  6733  342  6734 0
 6731  6732  6733  342 -6735 0
 6731  6732  6733  342  6736 0

c  -1-1 --> -2
c    ( b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧  b^{3, 114}_0 ∧ -p_342) -> ( b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0)
c  in CNF:
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨  b^{3, 115}_2
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨  b^{3, 115}_1
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨  p_342 ∨ -b^{3, 115}_0
c  in DIMACS:
-6731  6732 -6733  342  6734 0
-6731  6732 -6733  342  6735 0
-6731  6732 -6733  342 -6736 0

c  -2-1 --> break 
c    ( b^{3, 114}_2 ∧  b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨  b^{3, 114}_0 ∨  p_342 ∨ break
c  in DIMACS:
-6731 -6732  6733  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 114}_2 ∧ -b^{3, 114}_1 ∧ -b^{3, 114}_0 ∧ true) 
c  in CNF:
c    -b^{3, 114}_2 ∨  b^{3, 114}_1 ∨  b^{3, 114}_0 ∨ false 
c  in DIMACS:
-6731  6732  6733  0

c  3 does not represent an automaton state.
c    -(-b^{3, 114}_2 ∧  b^{3, 114}_1 ∧  b^{3, 114}_0 ∧ true) 
c  in CNF:
c     b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ false 
c  in DIMACS:
 6731 -6732 -6733  0
c  -3 does not represent an automaton state.
c    -( b^{3, 114}_2 ∧  b^{3, 114}_1 ∧  b^{3, 114}_0 ∧ true) 
c  in CNF:
c    -b^{3, 114}_2 ∨ -b^{3, 114}_1 ∨ -b^{3, 114}_0 ∨ false 
c  in DIMACS:
-6731 -6732 -6733  0

c i = 115
c  -2+1 --> -1
c    ( b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧  p_345) -> ( b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0)
c  in CNF:
c    -b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨  b^{3, 116}_2
c    -b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_1
c    -b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨  b^{3, 116}_0
c  in DIMACS:
-6734 -6735  6736 -345  6737 0
-6734 -6735  6736 -345 -6738 0
-6734 -6735  6736 -345  6739 0

c  -1+1 --> 0
c    ( b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0 ∧  p_345) -> (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧ -b^{3, 116}_0)
c  in CNF:
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_2
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_1
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_0
c  in DIMACS:
-6734  6735 -6736 -345 -6737 0
-6734  6735 -6736 -345 -6738 0
-6734  6735 -6736 -345 -6739 0

c  0+1 --> 1
c    (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧  p_345) -> (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0)
c  in CNF:
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_2
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_1
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨  b^{3, 116}_0
c  in DIMACS:
 6734  6735  6736 -345 -6737 0
 6734  6735  6736 -345 -6738 0
 6734  6735  6736 -345  6739 0

c  1+1 --> 2
c    (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0 ∧  p_345) -> (-b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0)
c  in CNF:
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_2
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨  b^{3, 116}_1
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ -p_345 ∨ -b^{3, 116}_0
c  in DIMACS:
 6734  6735 -6736 -345 -6737 0
 6734  6735 -6736 -345  6738 0
 6734  6735 -6736 -345 -6739 0

c  2+1 --> break 
c    (-b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧  p_345) -> break
c  in CNF:
c     b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 6734 -6735  6736 -345 1162 0


c  2-1 --> 1
c    (-b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧ -p_345) -> (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0)
c  in CNF:
c     b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_2
c     b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_1
c     b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨  b^{3, 116}_0
c  in DIMACS:
 6734 -6735  6736  345 -6737 0
 6734 -6735  6736  345 -6738 0
 6734 -6735  6736  345  6739 0

c  1-1 --> 0
c    (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0 ∧ -p_345) -> (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧ -b^{3, 116}_0)
c  in CNF:
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_2
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_1
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_0
c  in DIMACS:
 6734  6735 -6736  345 -6737 0
 6734  6735 -6736  345 -6738 0
 6734  6735 -6736  345 -6739 0

c  0-1 --> -1
c    (-b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧ -p_345) -> ( b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0)
c  in CNF:
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨  b^{3, 116}_2
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_1
c     b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨  b^{3, 116}_0
c  in DIMACS:
 6734  6735  6736  345  6737 0
 6734  6735  6736  345 -6738 0
 6734  6735  6736  345  6739 0

c  -1-1 --> -2
c    ( b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧  b^{3, 115}_0 ∧ -p_345) -> ( b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0)
c  in CNF:
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨  b^{3, 116}_2
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨  b^{3, 116}_1
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨  p_345 ∨ -b^{3, 116}_0
c  in DIMACS:
-6734  6735 -6736  345  6737 0
-6734  6735 -6736  345  6738 0
-6734  6735 -6736  345 -6739 0

c  -2-1 --> break 
c    ( b^{3, 115}_2 ∧  b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨  b^{3, 115}_0 ∨  p_345 ∨ break
c  in DIMACS:
-6734 -6735  6736  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 115}_2 ∧ -b^{3, 115}_1 ∧ -b^{3, 115}_0 ∧ true) 
c  in CNF:
c    -b^{3, 115}_2 ∨  b^{3, 115}_1 ∨  b^{3, 115}_0 ∨ false 
c  in DIMACS:
-6734  6735  6736  0

c  3 does not represent an automaton state.
c    -(-b^{3, 115}_2 ∧  b^{3, 115}_1 ∧  b^{3, 115}_0 ∧ true) 
c  in CNF:
c     b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ false 
c  in DIMACS:
 6734 -6735 -6736  0
c  -3 does not represent an automaton state.
c    -( b^{3, 115}_2 ∧  b^{3, 115}_1 ∧  b^{3, 115}_0 ∧ true) 
c  in CNF:
c    -b^{3, 115}_2 ∨ -b^{3, 115}_1 ∨ -b^{3, 115}_0 ∨ false 
c  in DIMACS:
-6734 -6735 -6736  0

c i = 116
c  -2+1 --> -1
c    ( b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧  p_348) -> ( b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0)
c  in CNF:
c    -b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨  b^{3, 117}_2
c    -b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_1
c    -b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨  b^{3, 117}_0
c  in DIMACS:
-6737 -6738  6739 -348  6740 0
-6737 -6738  6739 -348 -6741 0
-6737 -6738  6739 -348  6742 0

c  -1+1 --> 0
c    ( b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0 ∧  p_348) -> (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧ -b^{3, 117}_0)
c  in CNF:
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_2
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_1
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_0
c  in DIMACS:
-6737  6738 -6739 -348 -6740 0
-6737  6738 -6739 -348 -6741 0
-6737  6738 -6739 -348 -6742 0

c  0+1 --> 1
c    (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧  p_348) -> (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0)
c  in CNF:
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_2
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_1
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨  b^{3, 117}_0
c  in DIMACS:
 6737  6738  6739 -348 -6740 0
 6737  6738  6739 -348 -6741 0
 6737  6738  6739 -348  6742 0

c  1+1 --> 2
c    (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0 ∧  p_348) -> (-b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0)
c  in CNF:
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_2
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨  b^{3, 117}_1
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ -p_348 ∨ -b^{3, 117}_0
c  in DIMACS:
 6737  6738 -6739 -348 -6740 0
 6737  6738 -6739 -348  6741 0
 6737  6738 -6739 -348 -6742 0

c  2+1 --> break 
c    (-b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧  p_348) -> break
c  in CNF:
c     b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 6737 -6738  6739 -348 1162 0


c  2-1 --> 1
c    (-b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧ -p_348) -> (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0)
c  in CNF:
c     b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_2
c     b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_1
c     b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨  b^{3, 117}_0
c  in DIMACS:
 6737 -6738  6739  348 -6740 0
 6737 -6738  6739  348 -6741 0
 6737 -6738  6739  348  6742 0

c  1-1 --> 0
c    (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0 ∧ -p_348) -> (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧ -b^{3, 117}_0)
c  in CNF:
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_2
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_1
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_0
c  in DIMACS:
 6737  6738 -6739  348 -6740 0
 6737  6738 -6739  348 -6741 0
 6737  6738 -6739  348 -6742 0

c  0-1 --> -1
c    (-b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧ -p_348) -> ( b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0)
c  in CNF:
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨  b^{3, 117}_2
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_1
c     b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨  b^{3, 117}_0
c  in DIMACS:
 6737  6738  6739  348  6740 0
 6737  6738  6739  348 -6741 0
 6737  6738  6739  348  6742 0

c  -1-1 --> -2
c    ( b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧  b^{3, 116}_0 ∧ -p_348) -> ( b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0)
c  in CNF:
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨  b^{3, 117}_2
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨  b^{3, 117}_1
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨  p_348 ∨ -b^{3, 117}_0
c  in DIMACS:
-6737  6738 -6739  348  6740 0
-6737  6738 -6739  348  6741 0
-6737  6738 -6739  348 -6742 0

c  -2-1 --> break 
c    ( b^{3, 116}_2 ∧  b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨  b^{3, 116}_0 ∨  p_348 ∨ break
c  in DIMACS:
-6737 -6738  6739  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 116}_2 ∧ -b^{3, 116}_1 ∧ -b^{3, 116}_0 ∧ true) 
c  in CNF:
c    -b^{3, 116}_2 ∨  b^{3, 116}_1 ∨  b^{3, 116}_0 ∨ false 
c  in DIMACS:
-6737  6738  6739  0

c  3 does not represent an automaton state.
c    -(-b^{3, 116}_2 ∧  b^{3, 116}_1 ∧  b^{3, 116}_0 ∧ true) 
c  in CNF:
c     b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ false 
c  in DIMACS:
 6737 -6738 -6739  0
c  -3 does not represent an automaton state.
c    -( b^{3, 116}_2 ∧  b^{3, 116}_1 ∧  b^{3, 116}_0 ∧ true) 
c  in CNF:
c    -b^{3, 116}_2 ∨ -b^{3, 116}_1 ∨ -b^{3, 116}_0 ∨ false 
c  in DIMACS:
-6737 -6738 -6739  0

c i = 117
c  -2+1 --> -1
c    ( b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧  p_351) -> ( b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0)
c  in CNF:
c    -b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨  b^{3, 118}_2
c    -b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_1
c    -b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨  b^{3, 118}_0
c  in DIMACS:
-6740 -6741  6742 -351  6743 0
-6740 -6741  6742 -351 -6744 0
-6740 -6741  6742 -351  6745 0

c  -1+1 --> 0
c    ( b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0 ∧  p_351) -> (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧ -b^{3, 118}_0)
c  in CNF:
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_2
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_1
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_0
c  in DIMACS:
-6740  6741 -6742 -351 -6743 0
-6740  6741 -6742 -351 -6744 0
-6740  6741 -6742 -351 -6745 0

c  0+1 --> 1
c    (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧  p_351) -> (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0)
c  in CNF:
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_2
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_1
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨  b^{3, 118}_0
c  in DIMACS:
 6740  6741  6742 -351 -6743 0
 6740  6741  6742 -351 -6744 0
 6740  6741  6742 -351  6745 0

c  1+1 --> 2
c    (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0 ∧  p_351) -> (-b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0)
c  in CNF:
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_2
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨  b^{3, 118}_1
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ -p_351 ∨ -b^{3, 118}_0
c  in DIMACS:
 6740  6741 -6742 -351 -6743 0
 6740  6741 -6742 -351  6744 0
 6740  6741 -6742 -351 -6745 0

c  2+1 --> break 
c    (-b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧  p_351) -> break
c  in CNF:
c     b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 6740 -6741  6742 -351 1162 0


c  2-1 --> 1
c    (-b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧ -p_351) -> (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0)
c  in CNF:
c     b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_2
c     b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_1
c     b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨  b^{3, 118}_0
c  in DIMACS:
 6740 -6741  6742  351 -6743 0
 6740 -6741  6742  351 -6744 0
 6740 -6741  6742  351  6745 0

c  1-1 --> 0
c    (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0 ∧ -p_351) -> (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧ -b^{3, 118}_0)
c  in CNF:
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_2
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_1
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_0
c  in DIMACS:
 6740  6741 -6742  351 -6743 0
 6740  6741 -6742  351 -6744 0
 6740  6741 -6742  351 -6745 0

c  0-1 --> -1
c    (-b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧ -p_351) -> ( b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0)
c  in CNF:
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨  b^{3, 118}_2
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_1
c     b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨  b^{3, 118}_0
c  in DIMACS:
 6740  6741  6742  351  6743 0
 6740  6741  6742  351 -6744 0
 6740  6741  6742  351  6745 0

c  -1-1 --> -2
c    ( b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧  b^{3, 117}_0 ∧ -p_351) -> ( b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0)
c  in CNF:
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨  b^{3, 118}_2
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨  b^{3, 118}_1
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨  p_351 ∨ -b^{3, 118}_0
c  in DIMACS:
-6740  6741 -6742  351  6743 0
-6740  6741 -6742  351  6744 0
-6740  6741 -6742  351 -6745 0

c  -2-1 --> break 
c    ( b^{3, 117}_2 ∧  b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨  b^{3, 117}_0 ∨  p_351 ∨ break
c  in DIMACS:
-6740 -6741  6742  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 117}_2 ∧ -b^{3, 117}_1 ∧ -b^{3, 117}_0 ∧ true) 
c  in CNF:
c    -b^{3, 117}_2 ∨  b^{3, 117}_1 ∨  b^{3, 117}_0 ∨ false 
c  in DIMACS:
-6740  6741  6742  0

c  3 does not represent an automaton state.
c    -(-b^{3, 117}_2 ∧  b^{3, 117}_1 ∧  b^{3, 117}_0 ∧ true) 
c  in CNF:
c     b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ false 
c  in DIMACS:
 6740 -6741 -6742  0
c  -3 does not represent an automaton state.
c    -( b^{3, 117}_2 ∧  b^{3, 117}_1 ∧  b^{3, 117}_0 ∧ true) 
c  in CNF:
c    -b^{3, 117}_2 ∨ -b^{3, 117}_1 ∨ -b^{3, 117}_0 ∨ false 
c  in DIMACS:
-6740 -6741 -6742  0

c i = 118
c  -2+1 --> -1
c    ( b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧  p_354) -> ( b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0)
c  in CNF:
c    -b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨  b^{3, 119}_2
c    -b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_1
c    -b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨  b^{3, 119}_0
c  in DIMACS:
-6743 -6744  6745 -354  6746 0
-6743 -6744  6745 -354 -6747 0
-6743 -6744  6745 -354  6748 0

c  -1+1 --> 0
c    ( b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0 ∧  p_354) -> (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧ -b^{3, 119}_0)
c  in CNF:
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_2
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_1
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_0
c  in DIMACS:
-6743  6744 -6745 -354 -6746 0
-6743  6744 -6745 -354 -6747 0
-6743  6744 -6745 -354 -6748 0

c  0+1 --> 1
c    (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧  p_354) -> (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0)
c  in CNF:
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_2
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_1
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨  b^{3, 119}_0
c  in DIMACS:
 6743  6744  6745 -354 -6746 0
 6743  6744  6745 -354 -6747 0
 6743  6744  6745 -354  6748 0

c  1+1 --> 2
c    (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0 ∧  p_354) -> (-b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0)
c  in CNF:
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_2
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨  b^{3, 119}_1
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ -p_354 ∨ -b^{3, 119}_0
c  in DIMACS:
 6743  6744 -6745 -354 -6746 0
 6743  6744 -6745 -354  6747 0
 6743  6744 -6745 -354 -6748 0

c  2+1 --> break 
c    (-b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧  p_354) -> break
c  in CNF:
c     b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 6743 -6744  6745 -354 1162 0


c  2-1 --> 1
c    (-b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧ -p_354) -> (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0)
c  in CNF:
c     b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_2
c     b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_1
c     b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨  b^{3, 119}_0
c  in DIMACS:
 6743 -6744  6745  354 -6746 0
 6743 -6744  6745  354 -6747 0
 6743 -6744  6745  354  6748 0

c  1-1 --> 0
c    (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0 ∧ -p_354) -> (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧ -b^{3, 119}_0)
c  in CNF:
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_2
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_1
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_0
c  in DIMACS:
 6743  6744 -6745  354 -6746 0
 6743  6744 -6745  354 -6747 0
 6743  6744 -6745  354 -6748 0

c  0-1 --> -1
c    (-b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧ -p_354) -> ( b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0)
c  in CNF:
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨  b^{3, 119}_2
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_1
c     b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨  b^{3, 119}_0
c  in DIMACS:
 6743  6744  6745  354  6746 0
 6743  6744  6745  354 -6747 0
 6743  6744  6745  354  6748 0

c  -1-1 --> -2
c    ( b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧  b^{3, 118}_0 ∧ -p_354) -> ( b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0)
c  in CNF:
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨  b^{3, 119}_2
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨  b^{3, 119}_1
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨  p_354 ∨ -b^{3, 119}_0
c  in DIMACS:
-6743  6744 -6745  354  6746 0
-6743  6744 -6745  354  6747 0
-6743  6744 -6745  354 -6748 0

c  -2-1 --> break 
c    ( b^{3, 118}_2 ∧  b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨  b^{3, 118}_0 ∨  p_354 ∨ break
c  in DIMACS:
-6743 -6744  6745  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 118}_2 ∧ -b^{3, 118}_1 ∧ -b^{3, 118}_0 ∧ true) 
c  in CNF:
c    -b^{3, 118}_2 ∨  b^{3, 118}_1 ∨  b^{3, 118}_0 ∨ false 
c  in DIMACS:
-6743  6744  6745  0

c  3 does not represent an automaton state.
c    -(-b^{3, 118}_2 ∧  b^{3, 118}_1 ∧  b^{3, 118}_0 ∧ true) 
c  in CNF:
c     b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ false 
c  in DIMACS:
 6743 -6744 -6745  0
c  -3 does not represent an automaton state.
c    -( b^{3, 118}_2 ∧  b^{3, 118}_1 ∧  b^{3, 118}_0 ∧ true) 
c  in CNF:
c    -b^{3, 118}_2 ∨ -b^{3, 118}_1 ∨ -b^{3, 118}_0 ∨ false 
c  in DIMACS:
-6743 -6744 -6745  0

c i = 119
c  -2+1 --> -1
c    ( b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧  p_357) -> ( b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0)
c  in CNF:
c    -b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨  b^{3, 120}_2
c    -b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_1
c    -b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨  b^{3, 120}_0
c  in DIMACS:
-6746 -6747  6748 -357  6749 0
-6746 -6747  6748 -357 -6750 0
-6746 -6747  6748 -357  6751 0

c  -1+1 --> 0
c    ( b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0 ∧  p_357) -> (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧ -b^{3, 120}_0)
c  in CNF:
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_2
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_1
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_0
c  in DIMACS:
-6746  6747 -6748 -357 -6749 0
-6746  6747 -6748 -357 -6750 0
-6746  6747 -6748 -357 -6751 0

c  0+1 --> 1
c    (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧  p_357) -> (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0)
c  in CNF:
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_2
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_1
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨  b^{3, 120}_0
c  in DIMACS:
 6746  6747  6748 -357 -6749 0
 6746  6747  6748 -357 -6750 0
 6746  6747  6748 -357  6751 0

c  1+1 --> 2
c    (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0 ∧  p_357) -> (-b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0)
c  in CNF:
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_2
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨  b^{3, 120}_1
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ -p_357 ∨ -b^{3, 120}_0
c  in DIMACS:
 6746  6747 -6748 -357 -6749 0
 6746  6747 -6748 -357  6750 0
 6746  6747 -6748 -357 -6751 0

c  2+1 --> break 
c    (-b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧  p_357) -> break
c  in CNF:
c     b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 6746 -6747  6748 -357 1162 0


c  2-1 --> 1
c    (-b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧ -p_357) -> (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0)
c  in CNF:
c     b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_2
c     b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_1
c     b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨  b^{3, 120}_0
c  in DIMACS:
 6746 -6747  6748  357 -6749 0
 6746 -6747  6748  357 -6750 0
 6746 -6747  6748  357  6751 0

c  1-1 --> 0
c    (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0 ∧ -p_357) -> (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧ -b^{3, 120}_0)
c  in CNF:
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_2
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_1
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_0
c  in DIMACS:
 6746  6747 -6748  357 -6749 0
 6746  6747 -6748  357 -6750 0
 6746  6747 -6748  357 -6751 0

c  0-1 --> -1
c    (-b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧ -p_357) -> ( b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0)
c  in CNF:
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨  b^{3, 120}_2
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_1
c     b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨  b^{3, 120}_0
c  in DIMACS:
 6746  6747  6748  357  6749 0
 6746  6747  6748  357 -6750 0
 6746  6747  6748  357  6751 0

c  -1-1 --> -2
c    ( b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧  b^{3, 119}_0 ∧ -p_357) -> ( b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0)
c  in CNF:
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨  b^{3, 120}_2
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨  b^{3, 120}_1
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨  p_357 ∨ -b^{3, 120}_0
c  in DIMACS:
-6746  6747 -6748  357  6749 0
-6746  6747 -6748  357  6750 0
-6746  6747 -6748  357 -6751 0

c  -2-1 --> break 
c    ( b^{3, 119}_2 ∧  b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨  b^{3, 119}_0 ∨  p_357 ∨ break
c  in DIMACS:
-6746 -6747  6748  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 119}_2 ∧ -b^{3, 119}_1 ∧ -b^{3, 119}_0 ∧ true) 
c  in CNF:
c    -b^{3, 119}_2 ∨  b^{3, 119}_1 ∨  b^{3, 119}_0 ∨ false 
c  in DIMACS:
-6746  6747  6748  0

c  3 does not represent an automaton state.
c    -(-b^{3, 119}_2 ∧  b^{3, 119}_1 ∧  b^{3, 119}_0 ∧ true) 
c  in CNF:
c     b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ false 
c  in DIMACS:
 6746 -6747 -6748  0
c  -3 does not represent an automaton state.
c    -( b^{3, 119}_2 ∧  b^{3, 119}_1 ∧  b^{3, 119}_0 ∧ true) 
c  in CNF:
c    -b^{3, 119}_2 ∨ -b^{3, 119}_1 ∨ -b^{3, 119}_0 ∨ false 
c  in DIMACS:
-6746 -6747 -6748  0

c i = 120
c  -2+1 --> -1
c    ( b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧  p_360) -> ( b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0)
c  in CNF:
c    -b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨  b^{3, 121}_2
c    -b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_1
c    -b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨  b^{3, 121}_0
c  in DIMACS:
-6749 -6750  6751 -360  6752 0
-6749 -6750  6751 -360 -6753 0
-6749 -6750  6751 -360  6754 0

c  -1+1 --> 0
c    ( b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0 ∧  p_360) -> (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧ -b^{3, 121}_0)
c  in CNF:
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_2
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_1
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_0
c  in DIMACS:
-6749  6750 -6751 -360 -6752 0
-6749  6750 -6751 -360 -6753 0
-6749  6750 -6751 -360 -6754 0

c  0+1 --> 1
c    (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧  p_360) -> (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0)
c  in CNF:
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_2
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_1
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨  b^{3, 121}_0
c  in DIMACS:
 6749  6750  6751 -360 -6752 0
 6749  6750  6751 -360 -6753 0
 6749  6750  6751 -360  6754 0

c  1+1 --> 2
c    (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0 ∧  p_360) -> (-b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0)
c  in CNF:
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_2
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨  b^{3, 121}_1
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ -p_360 ∨ -b^{3, 121}_0
c  in DIMACS:
 6749  6750 -6751 -360 -6752 0
 6749  6750 -6751 -360  6753 0
 6749  6750 -6751 -360 -6754 0

c  2+1 --> break 
c    (-b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧  p_360) -> break
c  in CNF:
c     b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 6749 -6750  6751 -360 1162 0


c  2-1 --> 1
c    (-b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧ -p_360) -> (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0)
c  in CNF:
c     b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_2
c     b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_1
c     b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨  b^{3, 121}_0
c  in DIMACS:
 6749 -6750  6751  360 -6752 0
 6749 -6750  6751  360 -6753 0
 6749 -6750  6751  360  6754 0

c  1-1 --> 0
c    (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0 ∧ -p_360) -> (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧ -b^{3, 121}_0)
c  in CNF:
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_2
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_1
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_0
c  in DIMACS:
 6749  6750 -6751  360 -6752 0
 6749  6750 -6751  360 -6753 0
 6749  6750 -6751  360 -6754 0

c  0-1 --> -1
c    (-b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧ -p_360) -> ( b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0)
c  in CNF:
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨  b^{3, 121}_2
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_1
c     b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨  b^{3, 121}_0
c  in DIMACS:
 6749  6750  6751  360  6752 0
 6749  6750  6751  360 -6753 0
 6749  6750  6751  360  6754 0

c  -1-1 --> -2
c    ( b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧  b^{3, 120}_0 ∧ -p_360) -> ( b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0)
c  in CNF:
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨  b^{3, 121}_2
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨  b^{3, 121}_1
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨  p_360 ∨ -b^{3, 121}_0
c  in DIMACS:
-6749  6750 -6751  360  6752 0
-6749  6750 -6751  360  6753 0
-6749  6750 -6751  360 -6754 0

c  -2-1 --> break 
c    ( b^{3, 120}_2 ∧  b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨  b^{3, 120}_0 ∨  p_360 ∨ break
c  in DIMACS:
-6749 -6750  6751  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 120}_2 ∧ -b^{3, 120}_1 ∧ -b^{3, 120}_0 ∧ true) 
c  in CNF:
c    -b^{3, 120}_2 ∨  b^{3, 120}_1 ∨  b^{3, 120}_0 ∨ false 
c  in DIMACS:
-6749  6750  6751  0

c  3 does not represent an automaton state.
c    -(-b^{3, 120}_2 ∧  b^{3, 120}_1 ∧  b^{3, 120}_0 ∧ true) 
c  in CNF:
c     b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ false 
c  in DIMACS:
 6749 -6750 -6751  0
c  -3 does not represent an automaton state.
c    -( b^{3, 120}_2 ∧  b^{3, 120}_1 ∧  b^{3, 120}_0 ∧ true) 
c  in CNF:
c    -b^{3, 120}_2 ∨ -b^{3, 120}_1 ∨ -b^{3, 120}_0 ∨ false 
c  in DIMACS:
-6749 -6750 -6751  0

c i = 121
c  -2+1 --> -1
c    ( b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧  p_363) -> ( b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0)
c  in CNF:
c    -b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨  b^{3, 122}_2
c    -b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_1
c    -b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨  b^{3, 122}_0
c  in DIMACS:
-6752 -6753  6754 -363  6755 0
-6752 -6753  6754 -363 -6756 0
-6752 -6753  6754 -363  6757 0

c  -1+1 --> 0
c    ( b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0 ∧  p_363) -> (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧ -b^{3, 122}_0)
c  in CNF:
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_2
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_1
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_0
c  in DIMACS:
-6752  6753 -6754 -363 -6755 0
-6752  6753 -6754 -363 -6756 0
-6752  6753 -6754 -363 -6757 0

c  0+1 --> 1
c    (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧  p_363) -> (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0)
c  in CNF:
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_2
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_1
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨  b^{3, 122}_0
c  in DIMACS:
 6752  6753  6754 -363 -6755 0
 6752  6753  6754 -363 -6756 0
 6752  6753  6754 -363  6757 0

c  1+1 --> 2
c    (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0 ∧  p_363) -> (-b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0)
c  in CNF:
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_2
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨  b^{3, 122}_1
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ -p_363 ∨ -b^{3, 122}_0
c  in DIMACS:
 6752  6753 -6754 -363 -6755 0
 6752  6753 -6754 -363  6756 0
 6752  6753 -6754 -363 -6757 0

c  2+1 --> break 
c    (-b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧  p_363) -> break
c  in CNF:
c     b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 6752 -6753  6754 -363 1162 0


c  2-1 --> 1
c    (-b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧ -p_363) -> (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0)
c  in CNF:
c     b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_2
c     b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_1
c     b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨  b^{3, 122}_0
c  in DIMACS:
 6752 -6753  6754  363 -6755 0
 6752 -6753  6754  363 -6756 0
 6752 -6753  6754  363  6757 0

c  1-1 --> 0
c    (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0 ∧ -p_363) -> (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧ -b^{3, 122}_0)
c  in CNF:
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_2
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_1
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_0
c  in DIMACS:
 6752  6753 -6754  363 -6755 0
 6752  6753 -6754  363 -6756 0
 6752  6753 -6754  363 -6757 0

c  0-1 --> -1
c    (-b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧ -p_363) -> ( b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0)
c  in CNF:
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨  b^{3, 122}_2
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_1
c     b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨  b^{3, 122}_0
c  in DIMACS:
 6752  6753  6754  363  6755 0
 6752  6753  6754  363 -6756 0
 6752  6753  6754  363  6757 0

c  -1-1 --> -2
c    ( b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧  b^{3, 121}_0 ∧ -p_363) -> ( b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0)
c  in CNF:
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨  b^{3, 122}_2
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨  b^{3, 122}_1
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨  p_363 ∨ -b^{3, 122}_0
c  in DIMACS:
-6752  6753 -6754  363  6755 0
-6752  6753 -6754  363  6756 0
-6752  6753 -6754  363 -6757 0

c  -2-1 --> break 
c    ( b^{3, 121}_2 ∧  b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨  b^{3, 121}_0 ∨  p_363 ∨ break
c  in DIMACS:
-6752 -6753  6754  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 121}_2 ∧ -b^{3, 121}_1 ∧ -b^{3, 121}_0 ∧ true) 
c  in CNF:
c    -b^{3, 121}_2 ∨  b^{3, 121}_1 ∨  b^{3, 121}_0 ∨ false 
c  in DIMACS:
-6752  6753  6754  0

c  3 does not represent an automaton state.
c    -(-b^{3, 121}_2 ∧  b^{3, 121}_1 ∧  b^{3, 121}_0 ∧ true) 
c  in CNF:
c     b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ false 
c  in DIMACS:
 6752 -6753 -6754  0
c  -3 does not represent an automaton state.
c    -( b^{3, 121}_2 ∧  b^{3, 121}_1 ∧  b^{3, 121}_0 ∧ true) 
c  in CNF:
c    -b^{3, 121}_2 ∨ -b^{3, 121}_1 ∨ -b^{3, 121}_0 ∨ false 
c  in DIMACS:
-6752 -6753 -6754  0

c i = 122
c  -2+1 --> -1
c    ( b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧  p_366) -> ( b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0)
c  in CNF:
c    -b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨  b^{3, 123}_2
c    -b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_1
c    -b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨  b^{3, 123}_0
c  in DIMACS:
-6755 -6756  6757 -366  6758 0
-6755 -6756  6757 -366 -6759 0
-6755 -6756  6757 -366  6760 0

c  -1+1 --> 0
c    ( b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0 ∧  p_366) -> (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧ -b^{3, 123}_0)
c  in CNF:
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_2
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_1
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_0
c  in DIMACS:
-6755  6756 -6757 -366 -6758 0
-6755  6756 -6757 -366 -6759 0
-6755  6756 -6757 -366 -6760 0

c  0+1 --> 1
c    (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧  p_366) -> (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0)
c  in CNF:
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_2
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_1
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨  b^{3, 123}_0
c  in DIMACS:
 6755  6756  6757 -366 -6758 0
 6755  6756  6757 -366 -6759 0
 6755  6756  6757 -366  6760 0

c  1+1 --> 2
c    (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0 ∧  p_366) -> (-b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0)
c  in CNF:
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_2
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨  b^{3, 123}_1
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ -p_366 ∨ -b^{3, 123}_0
c  in DIMACS:
 6755  6756 -6757 -366 -6758 0
 6755  6756 -6757 -366  6759 0
 6755  6756 -6757 -366 -6760 0

c  2+1 --> break 
c    (-b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧  p_366) -> break
c  in CNF:
c     b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 6755 -6756  6757 -366 1162 0


c  2-1 --> 1
c    (-b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧ -p_366) -> (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0)
c  in CNF:
c     b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_2
c     b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_1
c     b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨  b^{3, 123}_0
c  in DIMACS:
 6755 -6756  6757  366 -6758 0
 6755 -6756  6757  366 -6759 0
 6755 -6756  6757  366  6760 0

c  1-1 --> 0
c    (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0 ∧ -p_366) -> (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧ -b^{3, 123}_0)
c  in CNF:
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_2
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_1
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_0
c  in DIMACS:
 6755  6756 -6757  366 -6758 0
 6755  6756 -6757  366 -6759 0
 6755  6756 -6757  366 -6760 0

c  0-1 --> -1
c    (-b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧ -p_366) -> ( b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0)
c  in CNF:
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨  b^{3, 123}_2
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_1
c     b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨  b^{3, 123}_0
c  in DIMACS:
 6755  6756  6757  366  6758 0
 6755  6756  6757  366 -6759 0
 6755  6756  6757  366  6760 0

c  -1-1 --> -2
c    ( b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧  b^{3, 122}_0 ∧ -p_366) -> ( b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0)
c  in CNF:
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨  b^{3, 123}_2
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨  b^{3, 123}_1
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨  p_366 ∨ -b^{3, 123}_0
c  in DIMACS:
-6755  6756 -6757  366  6758 0
-6755  6756 -6757  366  6759 0
-6755  6756 -6757  366 -6760 0

c  -2-1 --> break 
c    ( b^{3, 122}_2 ∧  b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨  b^{3, 122}_0 ∨  p_366 ∨ break
c  in DIMACS:
-6755 -6756  6757  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 122}_2 ∧ -b^{3, 122}_1 ∧ -b^{3, 122}_0 ∧ true) 
c  in CNF:
c    -b^{3, 122}_2 ∨  b^{3, 122}_1 ∨  b^{3, 122}_0 ∨ false 
c  in DIMACS:
-6755  6756  6757  0

c  3 does not represent an automaton state.
c    -(-b^{3, 122}_2 ∧  b^{3, 122}_1 ∧  b^{3, 122}_0 ∧ true) 
c  in CNF:
c     b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ false 
c  in DIMACS:
 6755 -6756 -6757  0
c  -3 does not represent an automaton state.
c    -( b^{3, 122}_2 ∧  b^{3, 122}_1 ∧  b^{3, 122}_0 ∧ true) 
c  in CNF:
c    -b^{3, 122}_2 ∨ -b^{3, 122}_1 ∨ -b^{3, 122}_0 ∨ false 
c  in DIMACS:
-6755 -6756 -6757  0

c i = 123
c  -2+1 --> -1
c    ( b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧  p_369) -> ( b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0)
c  in CNF:
c    -b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨  b^{3, 124}_2
c    -b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_1
c    -b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨  b^{3, 124}_0
c  in DIMACS:
-6758 -6759  6760 -369  6761 0
-6758 -6759  6760 -369 -6762 0
-6758 -6759  6760 -369  6763 0

c  -1+1 --> 0
c    ( b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0 ∧  p_369) -> (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧ -b^{3, 124}_0)
c  in CNF:
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_2
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_1
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_0
c  in DIMACS:
-6758  6759 -6760 -369 -6761 0
-6758  6759 -6760 -369 -6762 0
-6758  6759 -6760 -369 -6763 0

c  0+1 --> 1
c    (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧  p_369) -> (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0)
c  in CNF:
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_2
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_1
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨  b^{3, 124}_0
c  in DIMACS:
 6758  6759  6760 -369 -6761 0
 6758  6759  6760 -369 -6762 0
 6758  6759  6760 -369  6763 0

c  1+1 --> 2
c    (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0 ∧  p_369) -> (-b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0)
c  in CNF:
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_2
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨  b^{3, 124}_1
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ -p_369 ∨ -b^{3, 124}_0
c  in DIMACS:
 6758  6759 -6760 -369 -6761 0
 6758  6759 -6760 -369  6762 0
 6758  6759 -6760 -369 -6763 0

c  2+1 --> break 
c    (-b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧  p_369) -> break
c  in CNF:
c     b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 6758 -6759  6760 -369 1162 0


c  2-1 --> 1
c    (-b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧ -p_369) -> (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0)
c  in CNF:
c     b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_2
c     b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_1
c     b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨  b^{3, 124}_0
c  in DIMACS:
 6758 -6759  6760  369 -6761 0
 6758 -6759  6760  369 -6762 0
 6758 -6759  6760  369  6763 0

c  1-1 --> 0
c    (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0 ∧ -p_369) -> (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧ -b^{3, 124}_0)
c  in CNF:
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_2
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_1
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_0
c  in DIMACS:
 6758  6759 -6760  369 -6761 0
 6758  6759 -6760  369 -6762 0
 6758  6759 -6760  369 -6763 0

c  0-1 --> -1
c    (-b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧ -p_369) -> ( b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0)
c  in CNF:
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨  b^{3, 124}_2
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_1
c     b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨  b^{3, 124}_0
c  in DIMACS:
 6758  6759  6760  369  6761 0
 6758  6759  6760  369 -6762 0
 6758  6759  6760  369  6763 0

c  -1-1 --> -2
c    ( b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧  b^{3, 123}_0 ∧ -p_369) -> ( b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0)
c  in CNF:
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨  b^{3, 124}_2
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨  b^{3, 124}_1
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨  p_369 ∨ -b^{3, 124}_0
c  in DIMACS:
-6758  6759 -6760  369  6761 0
-6758  6759 -6760  369  6762 0
-6758  6759 -6760  369 -6763 0

c  -2-1 --> break 
c    ( b^{3, 123}_2 ∧  b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨  b^{3, 123}_0 ∨  p_369 ∨ break
c  in DIMACS:
-6758 -6759  6760  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 123}_2 ∧ -b^{3, 123}_1 ∧ -b^{3, 123}_0 ∧ true) 
c  in CNF:
c    -b^{3, 123}_2 ∨  b^{3, 123}_1 ∨  b^{3, 123}_0 ∨ false 
c  in DIMACS:
-6758  6759  6760  0

c  3 does not represent an automaton state.
c    -(-b^{3, 123}_2 ∧  b^{3, 123}_1 ∧  b^{3, 123}_0 ∧ true) 
c  in CNF:
c     b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ false 
c  in DIMACS:
 6758 -6759 -6760  0
c  -3 does not represent an automaton state.
c    -( b^{3, 123}_2 ∧  b^{3, 123}_1 ∧  b^{3, 123}_0 ∧ true) 
c  in CNF:
c    -b^{3, 123}_2 ∨ -b^{3, 123}_1 ∨ -b^{3, 123}_0 ∨ false 
c  in DIMACS:
-6758 -6759 -6760  0

c i = 124
c  -2+1 --> -1
c    ( b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧  p_372) -> ( b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0)
c  in CNF:
c    -b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨  b^{3, 125}_2
c    -b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_1
c    -b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨  b^{3, 125}_0
c  in DIMACS:
-6761 -6762  6763 -372  6764 0
-6761 -6762  6763 -372 -6765 0
-6761 -6762  6763 -372  6766 0

c  -1+1 --> 0
c    ( b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0 ∧  p_372) -> (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧ -b^{3, 125}_0)
c  in CNF:
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_2
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_1
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_0
c  in DIMACS:
-6761  6762 -6763 -372 -6764 0
-6761  6762 -6763 -372 -6765 0
-6761  6762 -6763 -372 -6766 0

c  0+1 --> 1
c    (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧  p_372) -> (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0)
c  in CNF:
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_2
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_1
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨  b^{3, 125}_0
c  in DIMACS:
 6761  6762  6763 -372 -6764 0
 6761  6762  6763 -372 -6765 0
 6761  6762  6763 -372  6766 0

c  1+1 --> 2
c    (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0 ∧  p_372) -> (-b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0)
c  in CNF:
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_2
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨  b^{3, 125}_1
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ -p_372 ∨ -b^{3, 125}_0
c  in DIMACS:
 6761  6762 -6763 -372 -6764 0
 6761  6762 -6763 -372  6765 0
 6761  6762 -6763 -372 -6766 0

c  2+1 --> break 
c    (-b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧  p_372) -> break
c  in CNF:
c     b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 6761 -6762  6763 -372 1162 0


c  2-1 --> 1
c    (-b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧ -p_372) -> (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0)
c  in CNF:
c     b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_2
c     b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_1
c     b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨  b^{3, 125}_0
c  in DIMACS:
 6761 -6762  6763  372 -6764 0
 6761 -6762  6763  372 -6765 0
 6761 -6762  6763  372  6766 0

c  1-1 --> 0
c    (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0 ∧ -p_372) -> (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧ -b^{3, 125}_0)
c  in CNF:
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_2
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_1
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_0
c  in DIMACS:
 6761  6762 -6763  372 -6764 0
 6761  6762 -6763  372 -6765 0
 6761  6762 -6763  372 -6766 0

c  0-1 --> -1
c    (-b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧ -p_372) -> ( b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0)
c  in CNF:
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨  b^{3, 125}_2
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_1
c     b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨  b^{3, 125}_0
c  in DIMACS:
 6761  6762  6763  372  6764 0
 6761  6762  6763  372 -6765 0
 6761  6762  6763  372  6766 0

c  -1-1 --> -2
c    ( b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧  b^{3, 124}_0 ∧ -p_372) -> ( b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0)
c  in CNF:
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨  b^{3, 125}_2
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨  b^{3, 125}_1
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨  p_372 ∨ -b^{3, 125}_0
c  in DIMACS:
-6761  6762 -6763  372  6764 0
-6761  6762 -6763  372  6765 0
-6761  6762 -6763  372 -6766 0

c  -2-1 --> break 
c    ( b^{3, 124}_2 ∧  b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨  b^{3, 124}_0 ∨  p_372 ∨ break
c  in DIMACS:
-6761 -6762  6763  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 124}_2 ∧ -b^{3, 124}_1 ∧ -b^{3, 124}_0 ∧ true) 
c  in CNF:
c    -b^{3, 124}_2 ∨  b^{3, 124}_1 ∨  b^{3, 124}_0 ∨ false 
c  in DIMACS:
-6761  6762  6763  0

c  3 does not represent an automaton state.
c    -(-b^{3, 124}_2 ∧  b^{3, 124}_1 ∧  b^{3, 124}_0 ∧ true) 
c  in CNF:
c     b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ false 
c  in DIMACS:
 6761 -6762 -6763  0
c  -3 does not represent an automaton state.
c    -( b^{3, 124}_2 ∧  b^{3, 124}_1 ∧  b^{3, 124}_0 ∧ true) 
c  in CNF:
c    -b^{3, 124}_2 ∨ -b^{3, 124}_1 ∨ -b^{3, 124}_0 ∨ false 
c  in DIMACS:
-6761 -6762 -6763  0

c i = 125
c  -2+1 --> -1
c    ( b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧  p_375) -> ( b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0)
c  in CNF:
c    -b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨  b^{3, 126}_2
c    -b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_1
c    -b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨  b^{3, 126}_0
c  in DIMACS:
-6764 -6765  6766 -375  6767 0
-6764 -6765  6766 -375 -6768 0
-6764 -6765  6766 -375  6769 0

c  -1+1 --> 0
c    ( b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0 ∧  p_375) -> (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧ -b^{3, 126}_0)
c  in CNF:
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_2
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_1
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_0
c  in DIMACS:
-6764  6765 -6766 -375 -6767 0
-6764  6765 -6766 -375 -6768 0
-6764  6765 -6766 -375 -6769 0

c  0+1 --> 1
c    (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧  p_375) -> (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0)
c  in CNF:
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_2
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_1
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨  b^{3, 126}_0
c  in DIMACS:
 6764  6765  6766 -375 -6767 0
 6764  6765  6766 -375 -6768 0
 6764  6765  6766 -375  6769 0

c  1+1 --> 2
c    (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0 ∧  p_375) -> (-b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0)
c  in CNF:
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_2
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨  b^{3, 126}_1
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ -p_375 ∨ -b^{3, 126}_0
c  in DIMACS:
 6764  6765 -6766 -375 -6767 0
 6764  6765 -6766 -375  6768 0
 6764  6765 -6766 -375 -6769 0

c  2+1 --> break 
c    (-b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧  p_375) -> break
c  in CNF:
c     b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 6764 -6765  6766 -375 1162 0


c  2-1 --> 1
c    (-b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧ -p_375) -> (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0)
c  in CNF:
c     b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_2
c     b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_1
c     b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨  b^{3, 126}_0
c  in DIMACS:
 6764 -6765  6766  375 -6767 0
 6764 -6765  6766  375 -6768 0
 6764 -6765  6766  375  6769 0

c  1-1 --> 0
c    (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0 ∧ -p_375) -> (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧ -b^{3, 126}_0)
c  in CNF:
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_2
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_1
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_0
c  in DIMACS:
 6764  6765 -6766  375 -6767 0
 6764  6765 -6766  375 -6768 0
 6764  6765 -6766  375 -6769 0

c  0-1 --> -1
c    (-b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧ -p_375) -> ( b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0)
c  in CNF:
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨  b^{3, 126}_2
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_1
c     b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨  b^{3, 126}_0
c  in DIMACS:
 6764  6765  6766  375  6767 0
 6764  6765  6766  375 -6768 0
 6764  6765  6766  375  6769 0

c  -1-1 --> -2
c    ( b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧  b^{3, 125}_0 ∧ -p_375) -> ( b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0)
c  in CNF:
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨  b^{3, 126}_2
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨  b^{3, 126}_1
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨  p_375 ∨ -b^{3, 126}_0
c  in DIMACS:
-6764  6765 -6766  375  6767 0
-6764  6765 -6766  375  6768 0
-6764  6765 -6766  375 -6769 0

c  -2-1 --> break 
c    ( b^{3, 125}_2 ∧  b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨  b^{3, 125}_0 ∨  p_375 ∨ break
c  in DIMACS:
-6764 -6765  6766  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 125}_2 ∧ -b^{3, 125}_1 ∧ -b^{3, 125}_0 ∧ true) 
c  in CNF:
c    -b^{3, 125}_2 ∨  b^{3, 125}_1 ∨  b^{3, 125}_0 ∨ false 
c  in DIMACS:
-6764  6765  6766  0

c  3 does not represent an automaton state.
c    -(-b^{3, 125}_2 ∧  b^{3, 125}_1 ∧  b^{3, 125}_0 ∧ true) 
c  in CNF:
c     b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ false 
c  in DIMACS:
 6764 -6765 -6766  0
c  -3 does not represent an automaton state.
c    -( b^{3, 125}_2 ∧  b^{3, 125}_1 ∧  b^{3, 125}_0 ∧ true) 
c  in CNF:
c    -b^{3, 125}_2 ∨ -b^{3, 125}_1 ∨ -b^{3, 125}_0 ∨ false 
c  in DIMACS:
-6764 -6765 -6766  0

c i = 126
c  -2+1 --> -1
c    ( b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧  p_378) -> ( b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0)
c  in CNF:
c    -b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨  b^{3, 127}_2
c    -b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_1
c    -b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨  b^{3, 127}_0
c  in DIMACS:
-6767 -6768  6769 -378  6770 0
-6767 -6768  6769 -378 -6771 0
-6767 -6768  6769 -378  6772 0

c  -1+1 --> 0
c    ( b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0 ∧  p_378) -> (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧ -b^{3, 127}_0)
c  in CNF:
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_2
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_1
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_0
c  in DIMACS:
-6767  6768 -6769 -378 -6770 0
-6767  6768 -6769 -378 -6771 0
-6767  6768 -6769 -378 -6772 0

c  0+1 --> 1
c    (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧  p_378) -> (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0)
c  in CNF:
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_2
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_1
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨  b^{3, 127}_0
c  in DIMACS:
 6767  6768  6769 -378 -6770 0
 6767  6768  6769 -378 -6771 0
 6767  6768  6769 -378  6772 0

c  1+1 --> 2
c    (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0 ∧  p_378) -> (-b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0)
c  in CNF:
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_2
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨  b^{3, 127}_1
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ -p_378 ∨ -b^{3, 127}_0
c  in DIMACS:
 6767  6768 -6769 -378 -6770 0
 6767  6768 -6769 -378  6771 0
 6767  6768 -6769 -378 -6772 0

c  2+1 --> break 
c    (-b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧  p_378) -> break
c  in CNF:
c     b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 6767 -6768  6769 -378 1162 0


c  2-1 --> 1
c    (-b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧ -p_378) -> (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0)
c  in CNF:
c     b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_2
c     b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_1
c     b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨  b^{3, 127}_0
c  in DIMACS:
 6767 -6768  6769  378 -6770 0
 6767 -6768  6769  378 -6771 0
 6767 -6768  6769  378  6772 0

c  1-1 --> 0
c    (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0 ∧ -p_378) -> (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧ -b^{3, 127}_0)
c  in CNF:
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_2
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_1
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_0
c  in DIMACS:
 6767  6768 -6769  378 -6770 0
 6767  6768 -6769  378 -6771 0
 6767  6768 -6769  378 -6772 0

c  0-1 --> -1
c    (-b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧ -p_378) -> ( b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0)
c  in CNF:
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨  b^{3, 127}_2
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_1
c     b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨  b^{3, 127}_0
c  in DIMACS:
 6767  6768  6769  378  6770 0
 6767  6768  6769  378 -6771 0
 6767  6768  6769  378  6772 0

c  -1-1 --> -2
c    ( b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧  b^{3, 126}_0 ∧ -p_378) -> ( b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0)
c  in CNF:
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨  b^{3, 127}_2
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨  b^{3, 127}_1
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨  p_378 ∨ -b^{3, 127}_0
c  in DIMACS:
-6767  6768 -6769  378  6770 0
-6767  6768 -6769  378  6771 0
-6767  6768 -6769  378 -6772 0

c  -2-1 --> break 
c    ( b^{3, 126}_2 ∧  b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨  b^{3, 126}_0 ∨  p_378 ∨ break
c  in DIMACS:
-6767 -6768  6769  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 126}_2 ∧ -b^{3, 126}_1 ∧ -b^{3, 126}_0 ∧ true) 
c  in CNF:
c    -b^{3, 126}_2 ∨  b^{3, 126}_1 ∨  b^{3, 126}_0 ∨ false 
c  in DIMACS:
-6767  6768  6769  0

c  3 does not represent an automaton state.
c    -(-b^{3, 126}_2 ∧  b^{3, 126}_1 ∧  b^{3, 126}_0 ∧ true) 
c  in CNF:
c     b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ false 
c  in DIMACS:
 6767 -6768 -6769  0
c  -3 does not represent an automaton state.
c    -( b^{3, 126}_2 ∧  b^{3, 126}_1 ∧  b^{3, 126}_0 ∧ true) 
c  in CNF:
c    -b^{3, 126}_2 ∨ -b^{3, 126}_1 ∨ -b^{3, 126}_0 ∨ false 
c  in DIMACS:
-6767 -6768 -6769  0

c i = 127
c  -2+1 --> -1
c    ( b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧  p_381) -> ( b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0)
c  in CNF:
c    -b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨  b^{3, 128}_2
c    -b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_1
c    -b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨  b^{3, 128}_0
c  in DIMACS:
-6770 -6771  6772 -381  6773 0
-6770 -6771  6772 -381 -6774 0
-6770 -6771  6772 -381  6775 0

c  -1+1 --> 0
c    ( b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0 ∧  p_381) -> (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧ -b^{3, 128}_0)
c  in CNF:
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_2
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_1
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_0
c  in DIMACS:
-6770  6771 -6772 -381 -6773 0
-6770  6771 -6772 -381 -6774 0
-6770  6771 -6772 -381 -6775 0

c  0+1 --> 1
c    (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧  p_381) -> (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0)
c  in CNF:
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_2
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_1
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨  b^{3, 128}_0
c  in DIMACS:
 6770  6771  6772 -381 -6773 0
 6770  6771  6772 -381 -6774 0
 6770  6771  6772 -381  6775 0

c  1+1 --> 2
c    (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0 ∧  p_381) -> (-b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0)
c  in CNF:
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_2
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨  b^{3, 128}_1
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ -p_381 ∨ -b^{3, 128}_0
c  in DIMACS:
 6770  6771 -6772 -381 -6773 0
 6770  6771 -6772 -381  6774 0
 6770  6771 -6772 -381 -6775 0

c  2+1 --> break 
c    (-b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧  p_381) -> break
c  in CNF:
c     b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ -p_381 ∨ break
c  in DIMACS:
 6770 -6771  6772 -381 1162 0


c  2-1 --> 1
c    (-b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧ -p_381) -> (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0)
c  in CNF:
c     b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_2
c     b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_1
c     b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨  b^{3, 128}_0
c  in DIMACS:
 6770 -6771  6772  381 -6773 0
 6770 -6771  6772  381 -6774 0
 6770 -6771  6772  381  6775 0

c  1-1 --> 0
c    (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0 ∧ -p_381) -> (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧ -b^{3, 128}_0)
c  in CNF:
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_2
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_1
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_0
c  in DIMACS:
 6770  6771 -6772  381 -6773 0
 6770  6771 -6772  381 -6774 0
 6770  6771 -6772  381 -6775 0

c  0-1 --> -1
c    (-b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧ -p_381) -> ( b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0)
c  in CNF:
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨  b^{3, 128}_2
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_1
c     b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨  b^{3, 128}_0
c  in DIMACS:
 6770  6771  6772  381  6773 0
 6770  6771  6772  381 -6774 0
 6770  6771  6772  381  6775 0

c  -1-1 --> -2
c    ( b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧  b^{3, 127}_0 ∧ -p_381) -> ( b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0)
c  in CNF:
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨  b^{3, 128}_2
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨  b^{3, 128}_1
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨  p_381 ∨ -b^{3, 128}_0
c  in DIMACS:
-6770  6771 -6772  381  6773 0
-6770  6771 -6772  381  6774 0
-6770  6771 -6772  381 -6775 0

c  -2-1 --> break 
c    ( b^{3, 127}_2 ∧  b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧ -p_381) -> break
c  in CNF:
c    -b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨  b^{3, 127}_0 ∨  p_381 ∨ break
c  in DIMACS:
-6770 -6771  6772  381 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 127}_2 ∧ -b^{3, 127}_1 ∧ -b^{3, 127}_0 ∧ true) 
c  in CNF:
c    -b^{3, 127}_2 ∨  b^{3, 127}_1 ∨  b^{3, 127}_0 ∨ false 
c  in DIMACS:
-6770  6771  6772  0

c  3 does not represent an automaton state.
c    -(-b^{3, 127}_2 ∧  b^{3, 127}_1 ∧  b^{3, 127}_0 ∧ true) 
c  in CNF:
c     b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ false 
c  in DIMACS:
 6770 -6771 -6772  0
c  -3 does not represent an automaton state.
c    -( b^{3, 127}_2 ∧  b^{3, 127}_1 ∧  b^{3, 127}_0 ∧ true) 
c  in CNF:
c    -b^{3, 127}_2 ∨ -b^{3, 127}_1 ∨ -b^{3, 127}_0 ∨ false 
c  in DIMACS:
-6770 -6771 -6772  0

c i = 128
c  -2+1 --> -1
c    ( b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧  p_384) -> ( b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0)
c  in CNF:
c    -b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨  b^{3, 129}_2
c    -b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_1
c    -b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨  b^{3, 129}_0
c  in DIMACS:
-6773 -6774  6775 -384  6776 0
-6773 -6774  6775 -384 -6777 0
-6773 -6774  6775 -384  6778 0

c  -1+1 --> 0
c    ( b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0 ∧  p_384) -> (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧ -b^{3, 129}_0)
c  in CNF:
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_2
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_1
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_0
c  in DIMACS:
-6773  6774 -6775 -384 -6776 0
-6773  6774 -6775 -384 -6777 0
-6773  6774 -6775 -384 -6778 0

c  0+1 --> 1
c    (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧  p_384) -> (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0)
c  in CNF:
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_2
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_1
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨  b^{3, 129}_0
c  in DIMACS:
 6773  6774  6775 -384 -6776 0
 6773  6774  6775 -384 -6777 0
 6773  6774  6775 -384  6778 0

c  1+1 --> 2
c    (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0 ∧  p_384) -> (-b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0)
c  in CNF:
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_2
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨  b^{3, 129}_1
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ -p_384 ∨ -b^{3, 129}_0
c  in DIMACS:
 6773  6774 -6775 -384 -6776 0
 6773  6774 -6775 -384  6777 0
 6773  6774 -6775 -384 -6778 0

c  2+1 --> break 
c    (-b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧  p_384) -> break
c  in CNF:
c     b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 6773 -6774  6775 -384 1162 0


c  2-1 --> 1
c    (-b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧ -p_384) -> (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0)
c  in CNF:
c     b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_2
c     b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_1
c     b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨  b^{3, 129}_0
c  in DIMACS:
 6773 -6774  6775  384 -6776 0
 6773 -6774  6775  384 -6777 0
 6773 -6774  6775  384  6778 0

c  1-1 --> 0
c    (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0 ∧ -p_384) -> (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧ -b^{3, 129}_0)
c  in CNF:
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_2
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_1
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_0
c  in DIMACS:
 6773  6774 -6775  384 -6776 0
 6773  6774 -6775  384 -6777 0
 6773  6774 -6775  384 -6778 0

c  0-1 --> -1
c    (-b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧ -p_384) -> ( b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0)
c  in CNF:
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨  b^{3, 129}_2
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_1
c     b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨  b^{3, 129}_0
c  in DIMACS:
 6773  6774  6775  384  6776 0
 6773  6774  6775  384 -6777 0
 6773  6774  6775  384  6778 0

c  -1-1 --> -2
c    ( b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧  b^{3, 128}_0 ∧ -p_384) -> ( b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0)
c  in CNF:
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨  b^{3, 129}_2
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨  b^{3, 129}_1
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨  p_384 ∨ -b^{3, 129}_0
c  in DIMACS:
-6773  6774 -6775  384  6776 0
-6773  6774 -6775  384  6777 0
-6773  6774 -6775  384 -6778 0

c  -2-1 --> break 
c    ( b^{3, 128}_2 ∧  b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨  b^{3, 128}_0 ∨  p_384 ∨ break
c  in DIMACS:
-6773 -6774  6775  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 128}_2 ∧ -b^{3, 128}_1 ∧ -b^{3, 128}_0 ∧ true) 
c  in CNF:
c    -b^{3, 128}_2 ∨  b^{3, 128}_1 ∨  b^{3, 128}_0 ∨ false 
c  in DIMACS:
-6773  6774  6775  0

c  3 does not represent an automaton state.
c    -(-b^{3, 128}_2 ∧  b^{3, 128}_1 ∧  b^{3, 128}_0 ∧ true) 
c  in CNF:
c     b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ false 
c  in DIMACS:
 6773 -6774 -6775  0
c  -3 does not represent an automaton state.
c    -( b^{3, 128}_2 ∧  b^{3, 128}_1 ∧  b^{3, 128}_0 ∧ true) 
c  in CNF:
c    -b^{3, 128}_2 ∨ -b^{3, 128}_1 ∨ -b^{3, 128}_0 ∨ false 
c  in DIMACS:
-6773 -6774 -6775  0

c i = 129
c  -2+1 --> -1
c    ( b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧  p_387) -> ( b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0)
c  in CNF:
c    -b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨  b^{3, 130}_2
c    -b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_1
c    -b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨  b^{3, 130}_0
c  in DIMACS:
-6776 -6777  6778 -387  6779 0
-6776 -6777  6778 -387 -6780 0
-6776 -6777  6778 -387  6781 0

c  -1+1 --> 0
c    ( b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0 ∧  p_387) -> (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧ -b^{3, 130}_0)
c  in CNF:
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_2
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_1
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_0
c  in DIMACS:
-6776  6777 -6778 -387 -6779 0
-6776  6777 -6778 -387 -6780 0
-6776  6777 -6778 -387 -6781 0

c  0+1 --> 1
c    (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧  p_387) -> (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0)
c  in CNF:
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_2
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_1
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨  b^{3, 130}_0
c  in DIMACS:
 6776  6777  6778 -387 -6779 0
 6776  6777  6778 -387 -6780 0
 6776  6777  6778 -387  6781 0

c  1+1 --> 2
c    (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0 ∧  p_387) -> (-b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0)
c  in CNF:
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_2
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨  b^{3, 130}_1
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ -p_387 ∨ -b^{3, 130}_0
c  in DIMACS:
 6776  6777 -6778 -387 -6779 0
 6776  6777 -6778 -387  6780 0
 6776  6777 -6778 -387 -6781 0

c  2+1 --> break 
c    (-b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧  p_387) -> break
c  in CNF:
c     b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 6776 -6777  6778 -387 1162 0


c  2-1 --> 1
c    (-b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧ -p_387) -> (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0)
c  in CNF:
c     b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_2
c     b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_1
c     b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨  b^{3, 130}_0
c  in DIMACS:
 6776 -6777  6778  387 -6779 0
 6776 -6777  6778  387 -6780 0
 6776 -6777  6778  387  6781 0

c  1-1 --> 0
c    (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0 ∧ -p_387) -> (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧ -b^{3, 130}_0)
c  in CNF:
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_2
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_1
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_0
c  in DIMACS:
 6776  6777 -6778  387 -6779 0
 6776  6777 -6778  387 -6780 0
 6776  6777 -6778  387 -6781 0

c  0-1 --> -1
c    (-b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧ -p_387) -> ( b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0)
c  in CNF:
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨  b^{3, 130}_2
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_1
c     b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨  b^{3, 130}_0
c  in DIMACS:
 6776  6777  6778  387  6779 0
 6776  6777  6778  387 -6780 0
 6776  6777  6778  387  6781 0

c  -1-1 --> -2
c    ( b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧  b^{3, 129}_0 ∧ -p_387) -> ( b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0)
c  in CNF:
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨  b^{3, 130}_2
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨  b^{3, 130}_1
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨  p_387 ∨ -b^{3, 130}_0
c  in DIMACS:
-6776  6777 -6778  387  6779 0
-6776  6777 -6778  387  6780 0
-6776  6777 -6778  387 -6781 0

c  -2-1 --> break 
c    ( b^{3, 129}_2 ∧  b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨  b^{3, 129}_0 ∨  p_387 ∨ break
c  in DIMACS:
-6776 -6777  6778  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 129}_2 ∧ -b^{3, 129}_1 ∧ -b^{3, 129}_0 ∧ true) 
c  in CNF:
c    -b^{3, 129}_2 ∨  b^{3, 129}_1 ∨  b^{3, 129}_0 ∨ false 
c  in DIMACS:
-6776  6777  6778  0

c  3 does not represent an automaton state.
c    -(-b^{3, 129}_2 ∧  b^{3, 129}_1 ∧  b^{3, 129}_0 ∧ true) 
c  in CNF:
c     b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ false 
c  in DIMACS:
 6776 -6777 -6778  0
c  -3 does not represent an automaton state.
c    -( b^{3, 129}_2 ∧  b^{3, 129}_1 ∧  b^{3, 129}_0 ∧ true) 
c  in CNF:
c    -b^{3, 129}_2 ∨ -b^{3, 129}_1 ∨ -b^{3, 129}_0 ∨ false 
c  in DIMACS:
-6776 -6777 -6778  0

c i = 130
c  -2+1 --> -1
c    ( b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧  p_390) -> ( b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0)
c  in CNF:
c    -b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨  b^{3, 131}_2
c    -b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_1
c    -b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨  b^{3, 131}_0
c  in DIMACS:
-6779 -6780  6781 -390  6782 0
-6779 -6780  6781 -390 -6783 0
-6779 -6780  6781 -390  6784 0

c  -1+1 --> 0
c    ( b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0 ∧  p_390) -> (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧ -b^{3, 131}_0)
c  in CNF:
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_2
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_1
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_0
c  in DIMACS:
-6779  6780 -6781 -390 -6782 0
-6779  6780 -6781 -390 -6783 0
-6779  6780 -6781 -390 -6784 0

c  0+1 --> 1
c    (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧  p_390) -> (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0)
c  in CNF:
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_2
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_1
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨  b^{3, 131}_0
c  in DIMACS:
 6779  6780  6781 -390 -6782 0
 6779  6780  6781 -390 -6783 0
 6779  6780  6781 -390  6784 0

c  1+1 --> 2
c    (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0 ∧  p_390) -> (-b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0)
c  in CNF:
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_2
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨  b^{3, 131}_1
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ -p_390 ∨ -b^{3, 131}_0
c  in DIMACS:
 6779  6780 -6781 -390 -6782 0
 6779  6780 -6781 -390  6783 0
 6779  6780 -6781 -390 -6784 0

c  2+1 --> break 
c    (-b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧  p_390) -> break
c  in CNF:
c     b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 6779 -6780  6781 -390 1162 0


c  2-1 --> 1
c    (-b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧ -p_390) -> (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0)
c  in CNF:
c     b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_2
c     b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_1
c     b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨  b^{3, 131}_0
c  in DIMACS:
 6779 -6780  6781  390 -6782 0
 6779 -6780  6781  390 -6783 0
 6779 -6780  6781  390  6784 0

c  1-1 --> 0
c    (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0 ∧ -p_390) -> (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧ -b^{3, 131}_0)
c  in CNF:
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_2
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_1
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_0
c  in DIMACS:
 6779  6780 -6781  390 -6782 0
 6779  6780 -6781  390 -6783 0
 6779  6780 -6781  390 -6784 0

c  0-1 --> -1
c    (-b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧ -p_390) -> ( b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0)
c  in CNF:
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨  b^{3, 131}_2
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_1
c     b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨  b^{3, 131}_0
c  in DIMACS:
 6779  6780  6781  390  6782 0
 6779  6780  6781  390 -6783 0
 6779  6780  6781  390  6784 0

c  -1-1 --> -2
c    ( b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧  b^{3, 130}_0 ∧ -p_390) -> ( b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0)
c  in CNF:
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨  b^{3, 131}_2
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨  b^{3, 131}_1
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨  p_390 ∨ -b^{3, 131}_0
c  in DIMACS:
-6779  6780 -6781  390  6782 0
-6779  6780 -6781  390  6783 0
-6779  6780 -6781  390 -6784 0

c  -2-1 --> break 
c    ( b^{3, 130}_2 ∧  b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨  b^{3, 130}_0 ∨  p_390 ∨ break
c  in DIMACS:
-6779 -6780  6781  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 130}_2 ∧ -b^{3, 130}_1 ∧ -b^{3, 130}_0 ∧ true) 
c  in CNF:
c    -b^{3, 130}_2 ∨  b^{3, 130}_1 ∨  b^{3, 130}_0 ∨ false 
c  in DIMACS:
-6779  6780  6781  0

c  3 does not represent an automaton state.
c    -(-b^{3, 130}_2 ∧  b^{3, 130}_1 ∧  b^{3, 130}_0 ∧ true) 
c  in CNF:
c     b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ false 
c  in DIMACS:
 6779 -6780 -6781  0
c  -3 does not represent an automaton state.
c    -( b^{3, 130}_2 ∧  b^{3, 130}_1 ∧  b^{3, 130}_0 ∧ true) 
c  in CNF:
c    -b^{3, 130}_2 ∨ -b^{3, 130}_1 ∨ -b^{3, 130}_0 ∨ false 
c  in DIMACS:
-6779 -6780 -6781  0

c i = 131
c  -2+1 --> -1
c    ( b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧  p_393) -> ( b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0)
c  in CNF:
c    -b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨  b^{3, 132}_2
c    -b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_1
c    -b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨  b^{3, 132}_0
c  in DIMACS:
-6782 -6783  6784 -393  6785 0
-6782 -6783  6784 -393 -6786 0
-6782 -6783  6784 -393  6787 0

c  -1+1 --> 0
c    ( b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0 ∧  p_393) -> (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧ -b^{3, 132}_0)
c  in CNF:
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_2
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_1
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_0
c  in DIMACS:
-6782  6783 -6784 -393 -6785 0
-6782  6783 -6784 -393 -6786 0
-6782  6783 -6784 -393 -6787 0

c  0+1 --> 1
c    (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧  p_393) -> (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0)
c  in CNF:
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_2
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_1
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨  b^{3, 132}_0
c  in DIMACS:
 6782  6783  6784 -393 -6785 0
 6782  6783  6784 -393 -6786 0
 6782  6783  6784 -393  6787 0

c  1+1 --> 2
c    (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0 ∧  p_393) -> (-b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0)
c  in CNF:
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_2
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨  b^{3, 132}_1
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ -p_393 ∨ -b^{3, 132}_0
c  in DIMACS:
 6782  6783 -6784 -393 -6785 0
 6782  6783 -6784 -393  6786 0
 6782  6783 -6784 -393 -6787 0

c  2+1 --> break 
c    (-b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧  p_393) -> break
c  in CNF:
c     b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ -p_393 ∨ break
c  in DIMACS:
 6782 -6783  6784 -393 1162 0


c  2-1 --> 1
c    (-b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧ -p_393) -> (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0)
c  in CNF:
c     b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_2
c     b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_1
c     b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨  b^{3, 132}_0
c  in DIMACS:
 6782 -6783  6784  393 -6785 0
 6782 -6783  6784  393 -6786 0
 6782 -6783  6784  393  6787 0

c  1-1 --> 0
c    (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0 ∧ -p_393) -> (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧ -b^{3, 132}_0)
c  in CNF:
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_2
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_1
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_0
c  in DIMACS:
 6782  6783 -6784  393 -6785 0
 6782  6783 -6784  393 -6786 0
 6782  6783 -6784  393 -6787 0

c  0-1 --> -1
c    (-b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧ -p_393) -> ( b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0)
c  in CNF:
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨  b^{3, 132}_2
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_1
c     b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨  b^{3, 132}_0
c  in DIMACS:
 6782  6783  6784  393  6785 0
 6782  6783  6784  393 -6786 0
 6782  6783  6784  393  6787 0

c  -1-1 --> -2
c    ( b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧  b^{3, 131}_0 ∧ -p_393) -> ( b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0)
c  in CNF:
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨  b^{3, 132}_2
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨  b^{3, 132}_1
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨  p_393 ∨ -b^{3, 132}_0
c  in DIMACS:
-6782  6783 -6784  393  6785 0
-6782  6783 -6784  393  6786 0
-6782  6783 -6784  393 -6787 0

c  -2-1 --> break 
c    ( b^{3, 131}_2 ∧  b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧ -p_393) -> break
c  in CNF:
c    -b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨  b^{3, 131}_0 ∨  p_393 ∨ break
c  in DIMACS:
-6782 -6783  6784  393 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 131}_2 ∧ -b^{3, 131}_1 ∧ -b^{3, 131}_0 ∧ true) 
c  in CNF:
c    -b^{3, 131}_2 ∨  b^{3, 131}_1 ∨  b^{3, 131}_0 ∨ false 
c  in DIMACS:
-6782  6783  6784  0

c  3 does not represent an automaton state.
c    -(-b^{3, 131}_2 ∧  b^{3, 131}_1 ∧  b^{3, 131}_0 ∧ true) 
c  in CNF:
c     b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ false 
c  in DIMACS:
 6782 -6783 -6784  0
c  -3 does not represent an automaton state.
c    -( b^{3, 131}_2 ∧  b^{3, 131}_1 ∧  b^{3, 131}_0 ∧ true) 
c  in CNF:
c    -b^{3, 131}_2 ∨ -b^{3, 131}_1 ∨ -b^{3, 131}_0 ∨ false 
c  in DIMACS:
-6782 -6783 -6784  0

c i = 132
c  -2+1 --> -1
c    ( b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧  p_396) -> ( b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0)
c  in CNF:
c    -b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨  b^{3, 133}_2
c    -b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_1
c    -b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨  b^{3, 133}_0
c  in DIMACS:
-6785 -6786  6787 -396  6788 0
-6785 -6786  6787 -396 -6789 0
-6785 -6786  6787 -396  6790 0

c  -1+1 --> 0
c    ( b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0 ∧  p_396) -> (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧ -b^{3, 133}_0)
c  in CNF:
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_2
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_1
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_0
c  in DIMACS:
-6785  6786 -6787 -396 -6788 0
-6785  6786 -6787 -396 -6789 0
-6785  6786 -6787 -396 -6790 0

c  0+1 --> 1
c    (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧  p_396) -> (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0)
c  in CNF:
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_2
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_1
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨  b^{3, 133}_0
c  in DIMACS:
 6785  6786  6787 -396 -6788 0
 6785  6786  6787 -396 -6789 0
 6785  6786  6787 -396  6790 0

c  1+1 --> 2
c    (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0 ∧  p_396) -> (-b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0)
c  in CNF:
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_2
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨  b^{3, 133}_1
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ -p_396 ∨ -b^{3, 133}_0
c  in DIMACS:
 6785  6786 -6787 -396 -6788 0
 6785  6786 -6787 -396  6789 0
 6785  6786 -6787 -396 -6790 0

c  2+1 --> break 
c    (-b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧  p_396) -> break
c  in CNF:
c     b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 6785 -6786  6787 -396 1162 0


c  2-1 --> 1
c    (-b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧ -p_396) -> (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0)
c  in CNF:
c     b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_2
c     b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_1
c     b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨  b^{3, 133}_0
c  in DIMACS:
 6785 -6786  6787  396 -6788 0
 6785 -6786  6787  396 -6789 0
 6785 -6786  6787  396  6790 0

c  1-1 --> 0
c    (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0 ∧ -p_396) -> (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧ -b^{3, 133}_0)
c  in CNF:
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_2
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_1
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_0
c  in DIMACS:
 6785  6786 -6787  396 -6788 0
 6785  6786 -6787  396 -6789 0
 6785  6786 -6787  396 -6790 0

c  0-1 --> -1
c    (-b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧ -p_396) -> ( b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0)
c  in CNF:
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨  b^{3, 133}_2
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_1
c     b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨  b^{3, 133}_0
c  in DIMACS:
 6785  6786  6787  396  6788 0
 6785  6786  6787  396 -6789 0
 6785  6786  6787  396  6790 0

c  -1-1 --> -2
c    ( b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧  b^{3, 132}_0 ∧ -p_396) -> ( b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0)
c  in CNF:
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨  b^{3, 133}_2
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨  b^{3, 133}_1
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨  p_396 ∨ -b^{3, 133}_0
c  in DIMACS:
-6785  6786 -6787  396  6788 0
-6785  6786 -6787  396  6789 0
-6785  6786 -6787  396 -6790 0

c  -2-1 --> break 
c    ( b^{3, 132}_2 ∧  b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨  b^{3, 132}_0 ∨  p_396 ∨ break
c  in DIMACS:
-6785 -6786  6787  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 132}_2 ∧ -b^{3, 132}_1 ∧ -b^{3, 132}_0 ∧ true) 
c  in CNF:
c    -b^{3, 132}_2 ∨  b^{3, 132}_1 ∨  b^{3, 132}_0 ∨ false 
c  in DIMACS:
-6785  6786  6787  0

c  3 does not represent an automaton state.
c    -(-b^{3, 132}_2 ∧  b^{3, 132}_1 ∧  b^{3, 132}_0 ∧ true) 
c  in CNF:
c     b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ false 
c  in DIMACS:
 6785 -6786 -6787  0
c  -3 does not represent an automaton state.
c    -( b^{3, 132}_2 ∧  b^{3, 132}_1 ∧  b^{3, 132}_0 ∧ true) 
c  in CNF:
c    -b^{3, 132}_2 ∨ -b^{3, 132}_1 ∨ -b^{3, 132}_0 ∨ false 
c  in DIMACS:
-6785 -6786 -6787  0

c i = 133
c  -2+1 --> -1
c    ( b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧  p_399) -> ( b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0)
c  in CNF:
c    -b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨  b^{3, 134}_2
c    -b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_1
c    -b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨  b^{3, 134}_0
c  in DIMACS:
-6788 -6789  6790 -399  6791 0
-6788 -6789  6790 -399 -6792 0
-6788 -6789  6790 -399  6793 0

c  -1+1 --> 0
c    ( b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0 ∧  p_399) -> (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧ -b^{3, 134}_0)
c  in CNF:
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_2
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_1
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_0
c  in DIMACS:
-6788  6789 -6790 -399 -6791 0
-6788  6789 -6790 -399 -6792 0
-6788  6789 -6790 -399 -6793 0

c  0+1 --> 1
c    (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧  p_399) -> (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0)
c  in CNF:
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_2
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_1
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨  b^{3, 134}_0
c  in DIMACS:
 6788  6789  6790 -399 -6791 0
 6788  6789  6790 -399 -6792 0
 6788  6789  6790 -399  6793 0

c  1+1 --> 2
c    (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0 ∧  p_399) -> (-b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0)
c  in CNF:
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_2
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨  b^{3, 134}_1
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ -p_399 ∨ -b^{3, 134}_0
c  in DIMACS:
 6788  6789 -6790 -399 -6791 0
 6788  6789 -6790 -399  6792 0
 6788  6789 -6790 -399 -6793 0

c  2+1 --> break 
c    (-b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧  p_399) -> break
c  in CNF:
c     b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 6788 -6789  6790 -399 1162 0


c  2-1 --> 1
c    (-b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧ -p_399) -> (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0)
c  in CNF:
c     b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_2
c     b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_1
c     b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨  b^{3, 134}_0
c  in DIMACS:
 6788 -6789  6790  399 -6791 0
 6788 -6789  6790  399 -6792 0
 6788 -6789  6790  399  6793 0

c  1-1 --> 0
c    (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0 ∧ -p_399) -> (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧ -b^{3, 134}_0)
c  in CNF:
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_2
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_1
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_0
c  in DIMACS:
 6788  6789 -6790  399 -6791 0
 6788  6789 -6790  399 -6792 0
 6788  6789 -6790  399 -6793 0

c  0-1 --> -1
c    (-b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧ -p_399) -> ( b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0)
c  in CNF:
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨  b^{3, 134}_2
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_1
c     b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨  b^{3, 134}_0
c  in DIMACS:
 6788  6789  6790  399  6791 0
 6788  6789  6790  399 -6792 0
 6788  6789  6790  399  6793 0

c  -1-1 --> -2
c    ( b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧  b^{3, 133}_0 ∧ -p_399) -> ( b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0)
c  in CNF:
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨  b^{3, 134}_2
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨  b^{3, 134}_1
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨  p_399 ∨ -b^{3, 134}_0
c  in DIMACS:
-6788  6789 -6790  399  6791 0
-6788  6789 -6790  399  6792 0
-6788  6789 -6790  399 -6793 0

c  -2-1 --> break 
c    ( b^{3, 133}_2 ∧  b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨  b^{3, 133}_0 ∨  p_399 ∨ break
c  in DIMACS:
-6788 -6789  6790  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 133}_2 ∧ -b^{3, 133}_1 ∧ -b^{3, 133}_0 ∧ true) 
c  in CNF:
c    -b^{3, 133}_2 ∨  b^{3, 133}_1 ∨  b^{3, 133}_0 ∨ false 
c  in DIMACS:
-6788  6789  6790  0

c  3 does not represent an automaton state.
c    -(-b^{3, 133}_2 ∧  b^{3, 133}_1 ∧  b^{3, 133}_0 ∧ true) 
c  in CNF:
c     b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ false 
c  in DIMACS:
 6788 -6789 -6790  0
c  -3 does not represent an automaton state.
c    -( b^{3, 133}_2 ∧  b^{3, 133}_1 ∧  b^{3, 133}_0 ∧ true) 
c  in CNF:
c    -b^{3, 133}_2 ∨ -b^{3, 133}_1 ∨ -b^{3, 133}_0 ∨ false 
c  in DIMACS:
-6788 -6789 -6790  0

c i = 134
c  -2+1 --> -1
c    ( b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧  p_402) -> ( b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0)
c  in CNF:
c    -b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨  b^{3, 135}_2
c    -b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_1
c    -b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨  b^{3, 135}_0
c  in DIMACS:
-6791 -6792  6793 -402  6794 0
-6791 -6792  6793 -402 -6795 0
-6791 -6792  6793 -402  6796 0

c  -1+1 --> 0
c    ( b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0 ∧  p_402) -> (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧ -b^{3, 135}_0)
c  in CNF:
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_2
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_1
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_0
c  in DIMACS:
-6791  6792 -6793 -402 -6794 0
-6791  6792 -6793 -402 -6795 0
-6791  6792 -6793 -402 -6796 0

c  0+1 --> 1
c    (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧  p_402) -> (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0)
c  in CNF:
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_2
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_1
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨  b^{3, 135}_0
c  in DIMACS:
 6791  6792  6793 -402 -6794 0
 6791  6792  6793 -402 -6795 0
 6791  6792  6793 -402  6796 0

c  1+1 --> 2
c    (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0 ∧  p_402) -> (-b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0)
c  in CNF:
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_2
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨  b^{3, 135}_1
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ -p_402 ∨ -b^{3, 135}_0
c  in DIMACS:
 6791  6792 -6793 -402 -6794 0
 6791  6792 -6793 -402  6795 0
 6791  6792 -6793 -402 -6796 0

c  2+1 --> break 
c    (-b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧  p_402) -> break
c  in CNF:
c     b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 6791 -6792  6793 -402 1162 0


c  2-1 --> 1
c    (-b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧ -p_402) -> (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0)
c  in CNF:
c     b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_2
c     b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_1
c     b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨  b^{3, 135}_0
c  in DIMACS:
 6791 -6792  6793  402 -6794 0
 6791 -6792  6793  402 -6795 0
 6791 -6792  6793  402  6796 0

c  1-1 --> 0
c    (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0 ∧ -p_402) -> (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧ -b^{3, 135}_0)
c  in CNF:
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_2
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_1
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_0
c  in DIMACS:
 6791  6792 -6793  402 -6794 0
 6791  6792 -6793  402 -6795 0
 6791  6792 -6793  402 -6796 0

c  0-1 --> -1
c    (-b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧ -p_402) -> ( b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0)
c  in CNF:
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨  b^{3, 135}_2
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_1
c     b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨  b^{3, 135}_0
c  in DIMACS:
 6791  6792  6793  402  6794 0
 6791  6792  6793  402 -6795 0
 6791  6792  6793  402  6796 0

c  -1-1 --> -2
c    ( b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧  b^{3, 134}_0 ∧ -p_402) -> ( b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0)
c  in CNF:
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨  b^{3, 135}_2
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨  b^{3, 135}_1
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨  p_402 ∨ -b^{3, 135}_0
c  in DIMACS:
-6791  6792 -6793  402  6794 0
-6791  6792 -6793  402  6795 0
-6791  6792 -6793  402 -6796 0

c  -2-1 --> break 
c    ( b^{3, 134}_2 ∧  b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨  b^{3, 134}_0 ∨  p_402 ∨ break
c  in DIMACS:
-6791 -6792  6793  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 134}_2 ∧ -b^{3, 134}_1 ∧ -b^{3, 134}_0 ∧ true) 
c  in CNF:
c    -b^{3, 134}_2 ∨  b^{3, 134}_1 ∨  b^{3, 134}_0 ∨ false 
c  in DIMACS:
-6791  6792  6793  0

c  3 does not represent an automaton state.
c    -(-b^{3, 134}_2 ∧  b^{3, 134}_1 ∧  b^{3, 134}_0 ∧ true) 
c  in CNF:
c     b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ false 
c  in DIMACS:
 6791 -6792 -6793  0
c  -3 does not represent an automaton state.
c    -( b^{3, 134}_2 ∧  b^{3, 134}_1 ∧  b^{3, 134}_0 ∧ true) 
c  in CNF:
c    -b^{3, 134}_2 ∨ -b^{3, 134}_1 ∨ -b^{3, 134}_0 ∨ false 
c  in DIMACS:
-6791 -6792 -6793  0

c i = 135
c  -2+1 --> -1
c    ( b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧  p_405) -> ( b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0)
c  in CNF:
c    -b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨  b^{3, 136}_2
c    -b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_1
c    -b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨  b^{3, 136}_0
c  in DIMACS:
-6794 -6795  6796 -405  6797 0
-6794 -6795  6796 -405 -6798 0
-6794 -6795  6796 -405  6799 0

c  -1+1 --> 0
c    ( b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0 ∧  p_405) -> (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧ -b^{3, 136}_0)
c  in CNF:
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_2
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_1
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_0
c  in DIMACS:
-6794  6795 -6796 -405 -6797 0
-6794  6795 -6796 -405 -6798 0
-6794  6795 -6796 -405 -6799 0

c  0+1 --> 1
c    (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧  p_405) -> (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0)
c  in CNF:
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_2
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_1
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨  b^{3, 136}_0
c  in DIMACS:
 6794  6795  6796 -405 -6797 0
 6794  6795  6796 -405 -6798 0
 6794  6795  6796 -405  6799 0

c  1+1 --> 2
c    (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0 ∧  p_405) -> (-b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0)
c  in CNF:
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_2
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨  b^{3, 136}_1
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ -p_405 ∨ -b^{3, 136}_0
c  in DIMACS:
 6794  6795 -6796 -405 -6797 0
 6794  6795 -6796 -405  6798 0
 6794  6795 -6796 -405 -6799 0

c  2+1 --> break 
c    (-b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧  p_405) -> break
c  in CNF:
c     b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 6794 -6795  6796 -405 1162 0


c  2-1 --> 1
c    (-b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧ -p_405) -> (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0)
c  in CNF:
c     b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_2
c     b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_1
c     b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨  b^{3, 136}_0
c  in DIMACS:
 6794 -6795  6796  405 -6797 0
 6794 -6795  6796  405 -6798 0
 6794 -6795  6796  405  6799 0

c  1-1 --> 0
c    (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0 ∧ -p_405) -> (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧ -b^{3, 136}_0)
c  in CNF:
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_2
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_1
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_0
c  in DIMACS:
 6794  6795 -6796  405 -6797 0
 6794  6795 -6796  405 -6798 0
 6794  6795 -6796  405 -6799 0

c  0-1 --> -1
c    (-b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧ -p_405) -> ( b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0)
c  in CNF:
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨  b^{3, 136}_2
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_1
c     b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨  b^{3, 136}_0
c  in DIMACS:
 6794  6795  6796  405  6797 0
 6794  6795  6796  405 -6798 0
 6794  6795  6796  405  6799 0

c  -1-1 --> -2
c    ( b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧  b^{3, 135}_0 ∧ -p_405) -> ( b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0)
c  in CNF:
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨  b^{3, 136}_2
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨  b^{3, 136}_1
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨  p_405 ∨ -b^{3, 136}_0
c  in DIMACS:
-6794  6795 -6796  405  6797 0
-6794  6795 -6796  405  6798 0
-6794  6795 -6796  405 -6799 0

c  -2-1 --> break 
c    ( b^{3, 135}_2 ∧  b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨  b^{3, 135}_0 ∨  p_405 ∨ break
c  in DIMACS:
-6794 -6795  6796  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 135}_2 ∧ -b^{3, 135}_1 ∧ -b^{3, 135}_0 ∧ true) 
c  in CNF:
c    -b^{3, 135}_2 ∨  b^{3, 135}_1 ∨  b^{3, 135}_0 ∨ false 
c  in DIMACS:
-6794  6795  6796  0

c  3 does not represent an automaton state.
c    -(-b^{3, 135}_2 ∧  b^{3, 135}_1 ∧  b^{3, 135}_0 ∧ true) 
c  in CNF:
c     b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ false 
c  in DIMACS:
 6794 -6795 -6796  0
c  -3 does not represent an automaton state.
c    -( b^{3, 135}_2 ∧  b^{3, 135}_1 ∧  b^{3, 135}_0 ∧ true) 
c  in CNF:
c    -b^{3, 135}_2 ∨ -b^{3, 135}_1 ∨ -b^{3, 135}_0 ∨ false 
c  in DIMACS:
-6794 -6795 -6796  0

c i = 136
c  -2+1 --> -1
c    ( b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧  p_408) -> ( b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0)
c  in CNF:
c    -b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨  b^{3, 137}_2
c    -b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_1
c    -b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨  b^{3, 137}_0
c  in DIMACS:
-6797 -6798  6799 -408  6800 0
-6797 -6798  6799 -408 -6801 0
-6797 -6798  6799 -408  6802 0

c  -1+1 --> 0
c    ( b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0 ∧  p_408) -> (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧ -b^{3, 137}_0)
c  in CNF:
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_2
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_1
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_0
c  in DIMACS:
-6797  6798 -6799 -408 -6800 0
-6797  6798 -6799 -408 -6801 0
-6797  6798 -6799 -408 -6802 0

c  0+1 --> 1
c    (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧  p_408) -> (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0)
c  in CNF:
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_2
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_1
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨  b^{3, 137}_0
c  in DIMACS:
 6797  6798  6799 -408 -6800 0
 6797  6798  6799 -408 -6801 0
 6797  6798  6799 -408  6802 0

c  1+1 --> 2
c    (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0 ∧  p_408) -> (-b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0)
c  in CNF:
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_2
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨  b^{3, 137}_1
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ -p_408 ∨ -b^{3, 137}_0
c  in DIMACS:
 6797  6798 -6799 -408 -6800 0
 6797  6798 -6799 -408  6801 0
 6797  6798 -6799 -408 -6802 0

c  2+1 --> break 
c    (-b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧  p_408) -> break
c  in CNF:
c     b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 6797 -6798  6799 -408 1162 0


c  2-1 --> 1
c    (-b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧ -p_408) -> (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0)
c  in CNF:
c     b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_2
c     b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_1
c     b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨  b^{3, 137}_0
c  in DIMACS:
 6797 -6798  6799  408 -6800 0
 6797 -6798  6799  408 -6801 0
 6797 -6798  6799  408  6802 0

c  1-1 --> 0
c    (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0 ∧ -p_408) -> (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧ -b^{3, 137}_0)
c  in CNF:
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_2
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_1
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_0
c  in DIMACS:
 6797  6798 -6799  408 -6800 0
 6797  6798 -6799  408 -6801 0
 6797  6798 -6799  408 -6802 0

c  0-1 --> -1
c    (-b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧ -p_408) -> ( b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0)
c  in CNF:
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨  b^{3, 137}_2
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_1
c     b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨  b^{3, 137}_0
c  in DIMACS:
 6797  6798  6799  408  6800 0
 6797  6798  6799  408 -6801 0
 6797  6798  6799  408  6802 0

c  -1-1 --> -2
c    ( b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧  b^{3, 136}_0 ∧ -p_408) -> ( b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0)
c  in CNF:
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨  b^{3, 137}_2
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨  b^{3, 137}_1
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨  p_408 ∨ -b^{3, 137}_0
c  in DIMACS:
-6797  6798 -6799  408  6800 0
-6797  6798 -6799  408  6801 0
-6797  6798 -6799  408 -6802 0

c  -2-1 --> break 
c    ( b^{3, 136}_2 ∧  b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨  b^{3, 136}_0 ∨  p_408 ∨ break
c  in DIMACS:
-6797 -6798  6799  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 136}_2 ∧ -b^{3, 136}_1 ∧ -b^{3, 136}_0 ∧ true) 
c  in CNF:
c    -b^{3, 136}_2 ∨  b^{3, 136}_1 ∨  b^{3, 136}_0 ∨ false 
c  in DIMACS:
-6797  6798  6799  0

c  3 does not represent an automaton state.
c    -(-b^{3, 136}_2 ∧  b^{3, 136}_1 ∧  b^{3, 136}_0 ∧ true) 
c  in CNF:
c     b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ false 
c  in DIMACS:
 6797 -6798 -6799  0
c  -3 does not represent an automaton state.
c    -( b^{3, 136}_2 ∧  b^{3, 136}_1 ∧  b^{3, 136}_0 ∧ true) 
c  in CNF:
c    -b^{3, 136}_2 ∨ -b^{3, 136}_1 ∨ -b^{3, 136}_0 ∨ false 
c  in DIMACS:
-6797 -6798 -6799  0

c i = 137
c  -2+1 --> -1
c    ( b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧  p_411) -> ( b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0)
c  in CNF:
c    -b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨  b^{3, 138}_2
c    -b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_1
c    -b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨  b^{3, 138}_0
c  in DIMACS:
-6800 -6801  6802 -411  6803 0
-6800 -6801  6802 -411 -6804 0
-6800 -6801  6802 -411  6805 0

c  -1+1 --> 0
c    ( b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0 ∧  p_411) -> (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧ -b^{3, 138}_0)
c  in CNF:
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_2
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_1
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_0
c  in DIMACS:
-6800  6801 -6802 -411 -6803 0
-6800  6801 -6802 -411 -6804 0
-6800  6801 -6802 -411 -6805 0

c  0+1 --> 1
c    (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧  p_411) -> (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0)
c  in CNF:
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_2
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_1
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨  b^{3, 138}_0
c  in DIMACS:
 6800  6801  6802 -411 -6803 0
 6800  6801  6802 -411 -6804 0
 6800  6801  6802 -411  6805 0

c  1+1 --> 2
c    (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0 ∧  p_411) -> (-b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0)
c  in CNF:
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_2
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨  b^{3, 138}_1
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ -p_411 ∨ -b^{3, 138}_0
c  in DIMACS:
 6800  6801 -6802 -411 -6803 0
 6800  6801 -6802 -411  6804 0
 6800  6801 -6802 -411 -6805 0

c  2+1 --> break 
c    (-b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧  p_411) -> break
c  in CNF:
c     b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ -p_411 ∨ break
c  in DIMACS:
 6800 -6801  6802 -411 1162 0


c  2-1 --> 1
c    (-b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧ -p_411) -> (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0)
c  in CNF:
c     b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_2
c     b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_1
c     b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨  b^{3, 138}_0
c  in DIMACS:
 6800 -6801  6802  411 -6803 0
 6800 -6801  6802  411 -6804 0
 6800 -6801  6802  411  6805 0

c  1-1 --> 0
c    (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0 ∧ -p_411) -> (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧ -b^{3, 138}_0)
c  in CNF:
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_2
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_1
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_0
c  in DIMACS:
 6800  6801 -6802  411 -6803 0
 6800  6801 -6802  411 -6804 0
 6800  6801 -6802  411 -6805 0

c  0-1 --> -1
c    (-b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧ -p_411) -> ( b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0)
c  in CNF:
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨  b^{3, 138}_2
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_1
c     b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨  b^{3, 138}_0
c  in DIMACS:
 6800  6801  6802  411  6803 0
 6800  6801  6802  411 -6804 0
 6800  6801  6802  411  6805 0

c  -1-1 --> -2
c    ( b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧  b^{3, 137}_0 ∧ -p_411) -> ( b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0)
c  in CNF:
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨  b^{3, 138}_2
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨  b^{3, 138}_1
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨  p_411 ∨ -b^{3, 138}_0
c  in DIMACS:
-6800  6801 -6802  411  6803 0
-6800  6801 -6802  411  6804 0
-6800  6801 -6802  411 -6805 0

c  -2-1 --> break 
c    ( b^{3, 137}_2 ∧  b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧ -p_411) -> break
c  in CNF:
c    -b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨  b^{3, 137}_0 ∨  p_411 ∨ break
c  in DIMACS:
-6800 -6801  6802  411 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 137}_2 ∧ -b^{3, 137}_1 ∧ -b^{3, 137}_0 ∧ true) 
c  in CNF:
c    -b^{3, 137}_2 ∨  b^{3, 137}_1 ∨  b^{3, 137}_0 ∨ false 
c  in DIMACS:
-6800  6801  6802  0

c  3 does not represent an automaton state.
c    -(-b^{3, 137}_2 ∧  b^{3, 137}_1 ∧  b^{3, 137}_0 ∧ true) 
c  in CNF:
c     b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ false 
c  in DIMACS:
 6800 -6801 -6802  0
c  -3 does not represent an automaton state.
c    -( b^{3, 137}_2 ∧  b^{3, 137}_1 ∧  b^{3, 137}_0 ∧ true) 
c  in CNF:
c    -b^{3, 137}_2 ∨ -b^{3, 137}_1 ∨ -b^{3, 137}_0 ∨ false 
c  in DIMACS:
-6800 -6801 -6802  0

c i = 138
c  -2+1 --> -1
c    ( b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧  p_414) -> ( b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0)
c  in CNF:
c    -b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨  b^{3, 139}_2
c    -b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_1
c    -b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨  b^{3, 139}_0
c  in DIMACS:
-6803 -6804  6805 -414  6806 0
-6803 -6804  6805 -414 -6807 0
-6803 -6804  6805 -414  6808 0

c  -1+1 --> 0
c    ( b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0 ∧  p_414) -> (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧ -b^{3, 139}_0)
c  in CNF:
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_2
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_1
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_0
c  in DIMACS:
-6803  6804 -6805 -414 -6806 0
-6803  6804 -6805 -414 -6807 0
-6803  6804 -6805 -414 -6808 0

c  0+1 --> 1
c    (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧  p_414) -> (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0)
c  in CNF:
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_2
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_1
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨  b^{3, 139}_0
c  in DIMACS:
 6803  6804  6805 -414 -6806 0
 6803  6804  6805 -414 -6807 0
 6803  6804  6805 -414  6808 0

c  1+1 --> 2
c    (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0 ∧  p_414) -> (-b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0)
c  in CNF:
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_2
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨  b^{3, 139}_1
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ -p_414 ∨ -b^{3, 139}_0
c  in DIMACS:
 6803  6804 -6805 -414 -6806 0
 6803  6804 -6805 -414  6807 0
 6803  6804 -6805 -414 -6808 0

c  2+1 --> break 
c    (-b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧  p_414) -> break
c  in CNF:
c     b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 6803 -6804  6805 -414 1162 0


c  2-1 --> 1
c    (-b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧ -p_414) -> (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0)
c  in CNF:
c     b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_2
c     b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_1
c     b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨  b^{3, 139}_0
c  in DIMACS:
 6803 -6804  6805  414 -6806 0
 6803 -6804  6805  414 -6807 0
 6803 -6804  6805  414  6808 0

c  1-1 --> 0
c    (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0 ∧ -p_414) -> (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧ -b^{3, 139}_0)
c  in CNF:
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_2
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_1
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_0
c  in DIMACS:
 6803  6804 -6805  414 -6806 0
 6803  6804 -6805  414 -6807 0
 6803  6804 -6805  414 -6808 0

c  0-1 --> -1
c    (-b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧ -p_414) -> ( b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0)
c  in CNF:
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨  b^{3, 139}_2
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_1
c     b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨  b^{3, 139}_0
c  in DIMACS:
 6803  6804  6805  414  6806 0
 6803  6804  6805  414 -6807 0
 6803  6804  6805  414  6808 0

c  -1-1 --> -2
c    ( b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧  b^{3, 138}_0 ∧ -p_414) -> ( b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0)
c  in CNF:
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨  b^{3, 139}_2
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨  b^{3, 139}_1
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨  p_414 ∨ -b^{3, 139}_0
c  in DIMACS:
-6803  6804 -6805  414  6806 0
-6803  6804 -6805  414  6807 0
-6803  6804 -6805  414 -6808 0

c  -2-1 --> break 
c    ( b^{3, 138}_2 ∧  b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨  b^{3, 138}_0 ∨  p_414 ∨ break
c  in DIMACS:
-6803 -6804  6805  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 138}_2 ∧ -b^{3, 138}_1 ∧ -b^{3, 138}_0 ∧ true) 
c  in CNF:
c    -b^{3, 138}_2 ∨  b^{3, 138}_1 ∨  b^{3, 138}_0 ∨ false 
c  in DIMACS:
-6803  6804  6805  0

c  3 does not represent an automaton state.
c    -(-b^{3, 138}_2 ∧  b^{3, 138}_1 ∧  b^{3, 138}_0 ∧ true) 
c  in CNF:
c     b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ false 
c  in DIMACS:
 6803 -6804 -6805  0
c  -3 does not represent an automaton state.
c    -( b^{3, 138}_2 ∧  b^{3, 138}_1 ∧  b^{3, 138}_0 ∧ true) 
c  in CNF:
c    -b^{3, 138}_2 ∨ -b^{3, 138}_1 ∨ -b^{3, 138}_0 ∨ false 
c  in DIMACS:
-6803 -6804 -6805  0

c i = 139
c  -2+1 --> -1
c    ( b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧  p_417) -> ( b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0)
c  in CNF:
c    -b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨  b^{3, 140}_2
c    -b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_1
c    -b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨  b^{3, 140}_0
c  in DIMACS:
-6806 -6807  6808 -417  6809 0
-6806 -6807  6808 -417 -6810 0
-6806 -6807  6808 -417  6811 0

c  -1+1 --> 0
c    ( b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0 ∧  p_417) -> (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧ -b^{3, 140}_0)
c  in CNF:
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_2
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_1
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_0
c  in DIMACS:
-6806  6807 -6808 -417 -6809 0
-6806  6807 -6808 -417 -6810 0
-6806  6807 -6808 -417 -6811 0

c  0+1 --> 1
c    (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧  p_417) -> (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0)
c  in CNF:
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_2
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_1
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨  b^{3, 140}_0
c  in DIMACS:
 6806  6807  6808 -417 -6809 0
 6806  6807  6808 -417 -6810 0
 6806  6807  6808 -417  6811 0

c  1+1 --> 2
c    (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0 ∧  p_417) -> (-b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0)
c  in CNF:
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_2
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨  b^{3, 140}_1
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ -p_417 ∨ -b^{3, 140}_0
c  in DIMACS:
 6806  6807 -6808 -417 -6809 0
 6806  6807 -6808 -417  6810 0
 6806  6807 -6808 -417 -6811 0

c  2+1 --> break 
c    (-b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧  p_417) -> break
c  in CNF:
c     b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ -p_417 ∨ break
c  in DIMACS:
 6806 -6807  6808 -417 1162 0


c  2-1 --> 1
c    (-b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧ -p_417) -> (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0)
c  in CNF:
c     b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_2
c     b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_1
c     b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨  b^{3, 140}_0
c  in DIMACS:
 6806 -6807  6808  417 -6809 0
 6806 -6807  6808  417 -6810 0
 6806 -6807  6808  417  6811 0

c  1-1 --> 0
c    (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0 ∧ -p_417) -> (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧ -b^{3, 140}_0)
c  in CNF:
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_2
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_1
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_0
c  in DIMACS:
 6806  6807 -6808  417 -6809 0
 6806  6807 -6808  417 -6810 0
 6806  6807 -6808  417 -6811 0

c  0-1 --> -1
c    (-b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧ -p_417) -> ( b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0)
c  in CNF:
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨  b^{3, 140}_2
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_1
c     b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨  b^{3, 140}_0
c  in DIMACS:
 6806  6807  6808  417  6809 0
 6806  6807  6808  417 -6810 0
 6806  6807  6808  417  6811 0

c  -1-1 --> -2
c    ( b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧  b^{3, 139}_0 ∧ -p_417) -> ( b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0)
c  in CNF:
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨  b^{3, 140}_2
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨  b^{3, 140}_1
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨  p_417 ∨ -b^{3, 140}_0
c  in DIMACS:
-6806  6807 -6808  417  6809 0
-6806  6807 -6808  417  6810 0
-6806  6807 -6808  417 -6811 0

c  -2-1 --> break 
c    ( b^{3, 139}_2 ∧  b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧ -p_417) -> break
c  in CNF:
c    -b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨  b^{3, 139}_0 ∨  p_417 ∨ break
c  in DIMACS:
-6806 -6807  6808  417 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 139}_2 ∧ -b^{3, 139}_1 ∧ -b^{3, 139}_0 ∧ true) 
c  in CNF:
c    -b^{3, 139}_2 ∨  b^{3, 139}_1 ∨  b^{3, 139}_0 ∨ false 
c  in DIMACS:
-6806  6807  6808  0

c  3 does not represent an automaton state.
c    -(-b^{3, 139}_2 ∧  b^{3, 139}_1 ∧  b^{3, 139}_0 ∧ true) 
c  in CNF:
c     b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ false 
c  in DIMACS:
 6806 -6807 -6808  0
c  -3 does not represent an automaton state.
c    -( b^{3, 139}_2 ∧  b^{3, 139}_1 ∧  b^{3, 139}_0 ∧ true) 
c  in CNF:
c    -b^{3, 139}_2 ∨ -b^{3, 139}_1 ∨ -b^{3, 139}_0 ∨ false 
c  in DIMACS:
-6806 -6807 -6808  0

c i = 140
c  -2+1 --> -1
c    ( b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧  p_420) -> ( b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0)
c  in CNF:
c    -b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨  b^{3, 141}_2
c    -b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_1
c    -b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨  b^{3, 141}_0
c  in DIMACS:
-6809 -6810  6811 -420  6812 0
-6809 -6810  6811 -420 -6813 0
-6809 -6810  6811 -420  6814 0

c  -1+1 --> 0
c    ( b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0 ∧  p_420) -> (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧ -b^{3, 141}_0)
c  in CNF:
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_2
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_1
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_0
c  in DIMACS:
-6809  6810 -6811 -420 -6812 0
-6809  6810 -6811 -420 -6813 0
-6809  6810 -6811 -420 -6814 0

c  0+1 --> 1
c    (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧  p_420) -> (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0)
c  in CNF:
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_2
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_1
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨  b^{3, 141}_0
c  in DIMACS:
 6809  6810  6811 -420 -6812 0
 6809  6810  6811 -420 -6813 0
 6809  6810  6811 -420  6814 0

c  1+1 --> 2
c    (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0 ∧  p_420) -> (-b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0)
c  in CNF:
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_2
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨  b^{3, 141}_1
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ -p_420 ∨ -b^{3, 141}_0
c  in DIMACS:
 6809  6810 -6811 -420 -6812 0
 6809  6810 -6811 -420  6813 0
 6809  6810 -6811 -420 -6814 0

c  2+1 --> break 
c    (-b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧  p_420) -> break
c  in CNF:
c     b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 6809 -6810  6811 -420 1162 0


c  2-1 --> 1
c    (-b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧ -p_420) -> (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0)
c  in CNF:
c     b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_2
c     b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_1
c     b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨  b^{3, 141}_0
c  in DIMACS:
 6809 -6810  6811  420 -6812 0
 6809 -6810  6811  420 -6813 0
 6809 -6810  6811  420  6814 0

c  1-1 --> 0
c    (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0 ∧ -p_420) -> (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧ -b^{3, 141}_0)
c  in CNF:
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_2
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_1
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_0
c  in DIMACS:
 6809  6810 -6811  420 -6812 0
 6809  6810 -6811  420 -6813 0
 6809  6810 -6811  420 -6814 0

c  0-1 --> -1
c    (-b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧ -p_420) -> ( b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0)
c  in CNF:
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨  b^{3, 141}_2
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_1
c     b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨  b^{3, 141}_0
c  in DIMACS:
 6809  6810  6811  420  6812 0
 6809  6810  6811  420 -6813 0
 6809  6810  6811  420  6814 0

c  -1-1 --> -2
c    ( b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧  b^{3, 140}_0 ∧ -p_420) -> ( b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0)
c  in CNF:
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨  b^{3, 141}_2
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨  b^{3, 141}_1
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨  p_420 ∨ -b^{3, 141}_0
c  in DIMACS:
-6809  6810 -6811  420  6812 0
-6809  6810 -6811  420  6813 0
-6809  6810 -6811  420 -6814 0

c  -2-1 --> break 
c    ( b^{3, 140}_2 ∧  b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨  b^{3, 140}_0 ∨  p_420 ∨ break
c  in DIMACS:
-6809 -6810  6811  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 140}_2 ∧ -b^{3, 140}_1 ∧ -b^{3, 140}_0 ∧ true) 
c  in CNF:
c    -b^{3, 140}_2 ∨  b^{3, 140}_1 ∨  b^{3, 140}_0 ∨ false 
c  in DIMACS:
-6809  6810  6811  0

c  3 does not represent an automaton state.
c    -(-b^{3, 140}_2 ∧  b^{3, 140}_1 ∧  b^{3, 140}_0 ∧ true) 
c  in CNF:
c     b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ false 
c  in DIMACS:
 6809 -6810 -6811  0
c  -3 does not represent an automaton state.
c    -( b^{3, 140}_2 ∧  b^{3, 140}_1 ∧  b^{3, 140}_0 ∧ true) 
c  in CNF:
c    -b^{3, 140}_2 ∨ -b^{3, 140}_1 ∨ -b^{3, 140}_0 ∨ false 
c  in DIMACS:
-6809 -6810 -6811  0

c i = 141
c  -2+1 --> -1
c    ( b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧  p_423) -> ( b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0)
c  in CNF:
c    -b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨  b^{3, 142}_2
c    -b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_1
c    -b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨  b^{3, 142}_0
c  in DIMACS:
-6812 -6813  6814 -423  6815 0
-6812 -6813  6814 -423 -6816 0
-6812 -6813  6814 -423  6817 0

c  -1+1 --> 0
c    ( b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0 ∧  p_423) -> (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧ -b^{3, 142}_0)
c  in CNF:
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_2
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_1
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_0
c  in DIMACS:
-6812  6813 -6814 -423 -6815 0
-6812  6813 -6814 -423 -6816 0
-6812  6813 -6814 -423 -6817 0

c  0+1 --> 1
c    (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧  p_423) -> (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0)
c  in CNF:
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_2
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_1
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨  b^{3, 142}_0
c  in DIMACS:
 6812  6813  6814 -423 -6815 0
 6812  6813  6814 -423 -6816 0
 6812  6813  6814 -423  6817 0

c  1+1 --> 2
c    (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0 ∧  p_423) -> (-b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0)
c  in CNF:
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_2
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨  b^{3, 142}_1
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ -p_423 ∨ -b^{3, 142}_0
c  in DIMACS:
 6812  6813 -6814 -423 -6815 0
 6812  6813 -6814 -423  6816 0
 6812  6813 -6814 -423 -6817 0

c  2+1 --> break 
c    (-b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧  p_423) -> break
c  in CNF:
c     b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ -p_423 ∨ break
c  in DIMACS:
 6812 -6813  6814 -423 1162 0


c  2-1 --> 1
c    (-b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧ -p_423) -> (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0)
c  in CNF:
c     b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_2
c     b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_1
c     b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨  b^{3, 142}_0
c  in DIMACS:
 6812 -6813  6814  423 -6815 0
 6812 -6813  6814  423 -6816 0
 6812 -6813  6814  423  6817 0

c  1-1 --> 0
c    (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0 ∧ -p_423) -> (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧ -b^{3, 142}_0)
c  in CNF:
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_2
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_1
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_0
c  in DIMACS:
 6812  6813 -6814  423 -6815 0
 6812  6813 -6814  423 -6816 0
 6812  6813 -6814  423 -6817 0

c  0-1 --> -1
c    (-b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧ -p_423) -> ( b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0)
c  in CNF:
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨  b^{3, 142}_2
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_1
c     b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨  b^{3, 142}_0
c  in DIMACS:
 6812  6813  6814  423  6815 0
 6812  6813  6814  423 -6816 0
 6812  6813  6814  423  6817 0

c  -1-1 --> -2
c    ( b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧  b^{3, 141}_0 ∧ -p_423) -> ( b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0)
c  in CNF:
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨  b^{3, 142}_2
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨  b^{3, 142}_1
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨  p_423 ∨ -b^{3, 142}_0
c  in DIMACS:
-6812  6813 -6814  423  6815 0
-6812  6813 -6814  423  6816 0
-6812  6813 -6814  423 -6817 0

c  -2-1 --> break 
c    ( b^{3, 141}_2 ∧  b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧ -p_423) -> break
c  in CNF:
c    -b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨  b^{3, 141}_0 ∨  p_423 ∨ break
c  in DIMACS:
-6812 -6813  6814  423 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 141}_2 ∧ -b^{3, 141}_1 ∧ -b^{3, 141}_0 ∧ true) 
c  in CNF:
c    -b^{3, 141}_2 ∨  b^{3, 141}_1 ∨  b^{3, 141}_0 ∨ false 
c  in DIMACS:
-6812  6813  6814  0

c  3 does not represent an automaton state.
c    -(-b^{3, 141}_2 ∧  b^{3, 141}_1 ∧  b^{3, 141}_0 ∧ true) 
c  in CNF:
c     b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ false 
c  in DIMACS:
 6812 -6813 -6814  0
c  -3 does not represent an automaton state.
c    -( b^{3, 141}_2 ∧  b^{3, 141}_1 ∧  b^{3, 141}_0 ∧ true) 
c  in CNF:
c    -b^{3, 141}_2 ∨ -b^{3, 141}_1 ∨ -b^{3, 141}_0 ∨ false 
c  in DIMACS:
-6812 -6813 -6814  0

c i = 142
c  -2+1 --> -1
c    ( b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧  p_426) -> ( b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0)
c  in CNF:
c    -b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨  b^{3, 143}_2
c    -b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_1
c    -b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨  b^{3, 143}_0
c  in DIMACS:
-6815 -6816  6817 -426  6818 0
-6815 -6816  6817 -426 -6819 0
-6815 -6816  6817 -426  6820 0

c  -1+1 --> 0
c    ( b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0 ∧  p_426) -> (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧ -b^{3, 143}_0)
c  in CNF:
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_2
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_1
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_0
c  in DIMACS:
-6815  6816 -6817 -426 -6818 0
-6815  6816 -6817 -426 -6819 0
-6815  6816 -6817 -426 -6820 0

c  0+1 --> 1
c    (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧  p_426) -> (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0)
c  in CNF:
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_2
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_1
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨  b^{3, 143}_0
c  in DIMACS:
 6815  6816  6817 -426 -6818 0
 6815  6816  6817 -426 -6819 0
 6815  6816  6817 -426  6820 0

c  1+1 --> 2
c    (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0 ∧  p_426) -> (-b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0)
c  in CNF:
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_2
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨  b^{3, 143}_1
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ -p_426 ∨ -b^{3, 143}_0
c  in DIMACS:
 6815  6816 -6817 -426 -6818 0
 6815  6816 -6817 -426  6819 0
 6815  6816 -6817 -426 -6820 0

c  2+1 --> break 
c    (-b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧  p_426) -> break
c  in CNF:
c     b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 6815 -6816  6817 -426 1162 0


c  2-1 --> 1
c    (-b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧ -p_426) -> (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0)
c  in CNF:
c     b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_2
c     b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_1
c     b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨  b^{3, 143}_0
c  in DIMACS:
 6815 -6816  6817  426 -6818 0
 6815 -6816  6817  426 -6819 0
 6815 -6816  6817  426  6820 0

c  1-1 --> 0
c    (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0 ∧ -p_426) -> (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧ -b^{3, 143}_0)
c  in CNF:
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_2
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_1
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_0
c  in DIMACS:
 6815  6816 -6817  426 -6818 0
 6815  6816 -6817  426 -6819 0
 6815  6816 -6817  426 -6820 0

c  0-1 --> -1
c    (-b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧ -p_426) -> ( b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0)
c  in CNF:
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨  b^{3, 143}_2
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_1
c     b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨  b^{3, 143}_0
c  in DIMACS:
 6815  6816  6817  426  6818 0
 6815  6816  6817  426 -6819 0
 6815  6816  6817  426  6820 0

c  -1-1 --> -2
c    ( b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧  b^{3, 142}_0 ∧ -p_426) -> ( b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0)
c  in CNF:
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨  b^{3, 143}_2
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨  b^{3, 143}_1
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨  p_426 ∨ -b^{3, 143}_0
c  in DIMACS:
-6815  6816 -6817  426  6818 0
-6815  6816 -6817  426  6819 0
-6815  6816 -6817  426 -6820 0

c  -2-1 --> break 
c    ( b^{3, 142}_2 ∧  b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨  b^{3, 142}_0 ∨  p_426 ∨ break
c  in DIMACS:
-6815 -6816  6817  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 142}_2 ∧ -b^{3, 142}_1 ∧ -b^{3, 142}_0 ∧ true) 
c  in CNF:
c    -b^{3, 142}_2 ∨  b^{3, 142}_1 ∨  b^{3, 142}_0 ∨ false 
c  in DIMACS:
-6815  6816  6817  0

c  3 does not represent an automaton state.
c    -(-b^{3, 142}_2 ∧  b^{3, 142}_1 ∧  b^{3, 142}_0 ∧ true) 
c  in CNF:
c     b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ false 
c  in DIMACS:
 6815 -6816 -6817  0
c  -3 does not represent an automaton state.
c    -( b^{3, 142}_2 ∧  b^{3, 142}_1 ∧  b^{3, 142}_0 ∧ true) 
c  in CNF:
c    -b^{3, 142}_2 ∨ -b^{3, 142}_1 ∨ -b^{3, 142}_0 ∨ false 
c  in DIMACS:
-6815 -6816 -6817  0

c i = 143
c  -2+1 --> -1
c    ( b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧  p_429) -> ( b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0)
c  in CNF:
c    -b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨  b^{3, 144}_2
c    -b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_1
c    -b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨  b^{3, 144}_0
c  in DIMACS:
-6818 -6819  6820 -429  6821 0
-6818 -6819  6820 -429 -6822 0
-6818 -6819  6820 -429  6823 0

c  -1+1 --> 0
c    ( b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0 ∧  p_429) -> (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧ -b^{3, 144}_0)
c  in CNF:
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_2
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_1
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_0
c  in DIMACS:
-6818  6819 -6820 -429 -6821 0
-6818  6819 -6820 -429 -6822 0
-6818  6819 -6820 -429 -6823 0

c  0+1 --> 1
c    (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧  p_429) -> (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0)
c  in CNF:
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_2
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_1
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨  b^{3, 144}_0
c  in DIMACS:
 6818  6819  6820 -429 -6821 0
 6818  6819  6820 -429 -6822 0
 6818  6819  6820 -429  6823 0

c  1+1 --> 2
c    (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0 ∧  p_429) -> (-b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0)
c  in CNF:
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_2
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨  b^{3, 144}_1
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ -p_429 ∨ -b^{3, 144}_0
c  in DIMACS:
 6818  6819 -6820 -429 -6821 0
 6818  6819 -6820 -429  6822 0
 6818  6819 -6820 -429 -6823 0

c  2+1 --> break 
c    (-b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧  p_429) -> break
c  in CNF:
c     b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 6818 -6819  6820 -429 1162 0


c  2-1 --> 1
c    (-b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧ -p_429) -> (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0)
c  in CNF:
c     b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_2
c     b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_1
c     b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨  b^{3, 144}_0
c  in DIMACS:
 6818 -6819  6820  429 -6821 0
 6818 -6819  6820  429 -6822 0
 6818 -6819  6820  429  6823 0

c  1-1 --> 0
c    (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0 ∧ -p_429) -> (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧ -b^{3, 144}_0)
c  in CNF:
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_2
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_1
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_0
c  in DIMACS:
 6818  6819 -6820  429 -6821 0
 6818  6819 -6820  429 -6822 0
 6818  6819 -6820  429 -6823 0

c  0-1 --> -1
c    (-b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧ -p_429) -> ( b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0)
c  in CNF:
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨  b^{3, 144}_2
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_1
c     b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨  b^{3, 144}_0
c  in DIMACS:
 6818  6819  6820  429  6821 0
 6818  6819  6820  429 -6822 0
 6818  6819  6820  429  6823 0

c  -1-1 --> -2
c    ( b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧  b^{3, 143}_0 ∧ -p_429) -> ( b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0)
c  in CNF:
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨  b^{3, 144}_2
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨  b^{3, 144}_1
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨  p_429 ∨ -b^{3, 144}_0
c  in DIMACS:
-6818  6819 -6820  429  6821 0
-6818  6819 -6820  429  6822 0
-6818  6819 -6820  429 -6823 0

c  -2-1 --> break 
c    ( b^{3, 143}_2 ∧  b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨  b^{3, 143}_0 ∨  p_429 ∨ break
c  in DIMACS:
-6818 -6819  6820  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 143}_2 ∧ -b^{3, 143}_1 ∧ -b^{3, 143}_0 ∧ true) 
c  in CNF:
c    -b^{3, 143}_2 ∨  b^{3, 143}_1 ∨  b^{3, 143}_0 ∨ false 
c  in DIMACS:
-6818  6819  6820  0

c  3 does not represent an automaton state.
c    -(-b^{3, 143}_2 ∧  b^{3, 143}_1 ∧  b^{3, 143}_0 ∧ true) 
c  in CNF:
c     b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ false 
c  in DIMACS:
 6818 -6819 -6820  0
c  -3 does not represent an automaton state.
c    -( b^{3, 143}_2 ∧  b^{3, 143}_1 ∧  b^{3, 143}_0 ∧ true) 
c  in CNF:
c    -b^{3, 143}_2 ∨ -b^{3, 143}_1 ∨ -b^{3, 143}_0 ∨ false 
c  in DIMACS:
-6818 -6819 -6820  0

c i = 144
c  -2+1 --> -1
c    ( b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧  p_432) -> ( b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0)
c  in CNF:
c    -b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨  b^{3, 145}_2
c    -b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_1
c    -b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨  b^{3, 145}_0
c  in DIMACS:
-6821 -6822  6823 -432  6824 0
-6821 -6822  6823 -432 -6825 0
-6821 -6822  6823 -432  6826 0

c  -1+1 --> 0
c    ( b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0 ∧  p_432) -> (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧ -b^{3, 145}_0)
c  in CNF:
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_2
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_1
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_0
c  in DIMACS:
-6821  6822 -6823 -432 -6824 0
-6821  6822 -6823 -432 -6825 0
-6821  6822 -6823 -432 -6826 0

c  0+1 --> 1
c    (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧  p_432) -> (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0)
c  in CNF:
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_2
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_1
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨  b^{3, 145}_0
c  in DIMACS:
 6821  6822  6823 -432 -6824 0
 6821  6822  6823 -432 -6825 0
 6821  6822  6823 -432  6826 0

c  1+1 --> 2
c    (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0 ∧  p_432) -> (-b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0)
c  in CNF:
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_2
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨  b^{3, 145}_1
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ -p_432 ∨ -b^{3, 145}_0
c  in DIMACS:
 6821  6822 -6823 -432 -6824 0
 6821  6822 -6823 -432  6825 0
 6821  6822 -6823 -432 -6826 0

c  2+1 --> break 
c    (-b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧  p_432) -> break
c  in CNF:
c     b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 6821 -6822  6823 -432 1162 0


c  2-1 --> 1
c    (-b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧ -p_432) -> (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0)
c  in CNF:
c     b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_2
c     b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_1
c     b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨  b^{3, 145}_0
c  in DIMACS:
 6821 -6822  6823  432 -6824 0
 6821 -6822  6823  432 -6825 0
 6821 -6822  6823  432  6826 0

c  1-1 --> 0
c    (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0 ∧ -p_432) -> (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧ -b^{3, 145}_0)
c  in CNF:
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_2
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_1
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_0
c  in DIMACS:
 6821  6822 -6823  432 -6824 0
 6821  6822 -6823  432 -6825 0
 6821  6822 -6823  432 -6826 0

c  0-1 --> -1
c    (-b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧ -p_432) -> ( b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0)
c  in CNF:
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨  b^{3, 145}_2
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_1
c     b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨  b^{3, 145}_0
c  in DIMACS:
 6821  6822  6823  432  6824 0
 6821  6822  6823  432 -6825 0
 6821  6822  6823  432  6826 0

c  -1-1 --> -2
c    ( b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧  b^{3, 144}_0 ∧ -p_432) -> ( b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0)
c  in CNF:
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨  b^{3, 145}_2
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨  b^{3, 145}_1
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨  p_432 ∨ -b^{3, 145}_0
c  in DIMACS:
-6821  6822 -6823  432  6824 0
-6821  6822 -6823  432  6825 0
-6821  6822 -6823  432 -6826 0

c  -2-1 --> break 
c    ( b^{3, 144}_2 ∧  b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨  b^{3, 144}_0 ∨  p_432 ∨ break
c  in DIMACS:
-6821 -6822  6823  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 144}_2 ∧ -b^{3, 144}_1 ∧ -b^{3, 144}_0 ∧ true) 
c  in CNF:
c    -b^{3, 144}_2 ∨  b^{3, 144}_1 ∨  b^{3, 144}_0 ∨ false 
c  in DIMACS:
-6821  6822  6823  0

c  3 does not represent an automaton state.
c    -(-b^{3, 144}_2 ∧  b^{3, 144}_1 ∧  b^{3, 144}_0 ∧ true) 
c  in CNF:
c     b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ false 
c  in DIMACS:
 6821 -6822 -6823  0
c  -3 does not represent an automaton state.
c    -( b^{3, 144}_2 ∧  b^{3, 144}_1 ∧  b^{3, 144}_0 ∧ true) 
c  in CNF:
c    -b^{3, 144}_2 ∨ -b^{3, 144}_1 ∨ -b^{3, 144}_0 ∨ false 
c  in DIMACS:
-6821 -6822 -6823  0

c i = 145
c  -2+1 --> -1
c    ( b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧  p_435) -> ( b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0)
c  in CNF:
c    -b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨  b^{3, 146}_2
c    -b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_1
c    -b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨  b^{3, 146}_0
c  in DIMACS:
-6824 -6825  6826 -435  6827 0
-6824 -6825  6826 -435 -6828 0
-6824 -6825  6826 -435  6829 0

c  -1+1 --> 0
c    ( b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0 ∧  p_435) -> (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧ -b^{3, 146}_0)
c  in CNF:
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_2
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_1
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_0
c  in DIMACS:
-6824  6825 -6826 -435 -6827 0
-6824  6825 -6826 -435 -6828 0
-6824  6825 -6826 -435 -6829 0

c  0+1 --> 1
c    (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧  p_435) -> (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0)
c  in CNF:
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_2
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_1
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨  b^{3, 146}_0
c  in DIMACS:
 6824  6825  6826 -435 -6827 0
 6824  6825  6826 -435 -6828 0
 6824  6825  6826 -435  6829 0

c  1+1 --> 2
c    (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0 ∧  p_435) -> (-b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0)
c  in CNF:
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_2
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨  b^{3, 146}_1
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ -p_435 ∨ -b^{3, 146}_0
c  in DIMACS:
 6824  6825 -6826 -435 -6827 0
 6824  6825 -6826 -435  6828 0
 6824  6825 -6826 -435 -6829 0

c  2+1 --> break 
c    (-b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧  p_435) -> break
c  in CNF:
c     b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 6824 -6825  6826 -435 1162 0


c  2-1 --> 1
c    (-b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧ -p_435) -> (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0)
c  in CNF:
c     b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_2
c     b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_1
c     b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨  b^{3, 146}_0
c  in DIMACS:
 6824 -6825  6826  435 -6827 0
 6824 -6825  6826  435 -6828 0
 6824 -6825  6826  435  6829 0

c  1-1 --> 0
c    (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0 ∧ -p_435) -> (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧ -b^{3, 146}_0)
c  in CNF:
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_2
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_1
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_0
c  in DIMACS:
 6824  6825 -6826  435 -6827 0
 6824  6825 -6826  435 -6828 0
 6824  6825 -6826  435 -6829 0

c  0-1 --> -1
c    (-b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧ -p_435) -> ( b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0)
c  in CNF:
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨  b^{3, 146}_2
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_1
c     b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨  b^{3, 146}_0
c  in DIMACS:
 6824  6825  6826  435  6827 0
 6824  6825  6826  435 -6828 0
 6824  6825  6826  435  6829 0

c  -1-1 --> -2
c    ( b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧  b^{3, 145}_0 ∧ -p_435) -> ( b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0)
c  in CNF:
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨  b^{3, 146}_2
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨  b^{3, 146}_1
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨  p_435 ∨ -b^{3, 146}_0
c  in DIMACS:
-6824  6825 -6826  435  6827 0
-6824  6825 -6826  435  6828 0
-6824  6825 -6826  435 -6829 0

c  -2-1 --> break 
c    ( b^{3, 145}_2 ∧  b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨  b^{3, 145}_0 ∨  p_435 ∨ break
c  in DIMACS:
-6824 -6825  6826  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 145}_2 ∧ -b^{3, 145}_1 ∧ -b^{3, 145}_0 ∧ true) 
c  in CNF:
c    -b^{3, 145}_2 ∨  b^{3, 145}_1 ∨  b^{3, 145}_0 ∨ false 
c  in DIMACS:
-6824  6825  6826  0

c  3 does not represent an automaton state.
c    -(-b^{3, 145}_2 ∧  b^{3, 145}_1 ∧  b^{3, 145}_0 ∧ true) 
c  in CNF:
c     b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ false 
c  in DIMACS:
 6824 -6825 -6826  0
c  -3 does not represent an automaton state.
c    -( b^{3, 145}_2 ∧  b^{3, 145}_1 ∧  b^{3, 145}_0 ∧ true) 
c  in CNF:
c    -b^{3, 145}_2 ∨ -b^{3, 145}_1 ∨ -b^{3, 145}_0 ∨ false 
c  in DIMACS:
-6824 -6825 -6826  0

c i = 146
c  -2+1 --> -1
c    ( b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧  p_438) -> ( b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0)
c  in CNF:
c    -b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨  b^{3, 147}_2
c    -b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_1
c    -b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨  b^{3, 147}_0
c  in DIMACS:
-6827 -6828  6829 -438  6830 0
-6827 -6828  6829 -438 -6831 0
-6827 -6828  6829 -438  6832 0

c  -1+1 --> 0
c    ( b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0 ∧  p_438) -> (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧ -b^{3, 147}_0)
c  in CNF:
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_2
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_1
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_0
c  in DIMACS:
-6827  6828 -6829 -438 -6830 0
-6827  6828 -6829 -438 -6831 0
-6827  6828 -6829 -438 -6832 0

c  0+1 --> 1
c    (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧  p_438) -> (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0)
c  in CNF:
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_2
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_1
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨  b^{3, 147}_0
c  in DIMACS:
 6827  6828  6829 -438 -6830 0
 6827  6828  6829 -438 -6831 0
 6827  6828  6829 -438  6832 0

c  1+1 --> 2
c    (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0 ∧  p_438) -> (-b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0)
c  in CNF:
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_2
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨  b^{3, 147}_1
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ -p_438 ∨ -b^{3, 147}_0
c  in DIMACS:
 6827  6828 -6829 -438 -6830 0
 6827  6828 -6829 -438  6831 0
 6827  6828 -6829 -438 -6832 0

c  2+1 --> break 
c    (-b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧  p_438) -> break
c  in CNF:
c     b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 6827 -6828  6829 -438 1162 0


c  2-1 --> 1
c    (-b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧ -p_438) -> (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0)
c  in CNF:
c     b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_2
c     b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_1
c     b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨  b^{3, 147}_0
c  in DIMACS:
 6827 -6828  6829  438 -6830 0
 6827 -6828  6829  438 -6831 0
 6827 -6828  6829  438  6832 0

c  1-1 --> 0
c    (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0 ∧ -p_438) -> (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧ -b^{3, 147}_0)
c  in CNF:
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_2
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_1
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_0
c  in DIMACS:
 6827  6828 -6829  438 -6830 0
 6827  6828 -6829  438 -6831 0
 6827  6828 -6829  438 -6832 0

c  0-1 --> -1
c    (-b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧ -p_438) -> ( b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0)
c  in CNF:
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨  b^{3, 147}_2
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_1
c     b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨  b^{3, 147}_0
c  in DIMACS:
 6827  6828  6829  438  6830 0
 6827  6828  6829  438 -6831 0
 6827  6828  6829  438  6832 0

c  -1-1 --> -2
c    ( b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧  b^{3, 146}_0 ∧ -p_438) -> ( b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0)
c  in CNF:
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨  b^{3, 147}_2
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨  b^{3, 147}_1
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨  p_438 ∨ -b^{3, 147}_0
c  in DIMACS:
-6827  6828 -6829  438  6830 0
-6827  6828 -6829  438  6831 0
-6827  6828 -6829  438 -6832 0

c  -2-1 --> break 
c    ( b^{3, 146}_2 ∧  b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨  b^{3, 146}_0 ∨  p_438 ∨ break
c  in DIMACS:
-6827 -6828  6829  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 146}_2 ∧ -b^{3, 146}_1 ∧ -b^{3, 146}_0 ∧ true) 
c  in CNF:
c    -b^{3, 146}_2 ∨  b^{3, 146}_1 ∨  b^{3, 146}_0 ∨ false 
c  in DIMACS:
-6827  6828  6829  0

c  3 does not represent an automaton state.
c    -(-b^{3, 146}_2 ∧  b^{3, 146}_1 ∧  b^{3, 146}_0 ∧ true) 
c  in CNF:
c     b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ false 
c  in DIMACS:
 6827 -6828 -6829  0
c  -3 does not represent an automaton state.
c    -( b^{3, 146}_2 ∧  b^{3, 146}_1 ∧  b^{3, 146}_0 ∧ true) 
c  in CNF:
c    -b^{3, 146}_2 ∨ -b^{3, 146}_1 ∨ -b^{3, 146}_0 ∨ false 
c  in DIMACS:
-6827 -6828 -6829  0

c i = 147
c  -2+1 --> -1
c    ( b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧  p_441) -> ( b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0)
c  in CNF:
c    -b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨  b^{3, 148}_2
c    -b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_1
c    -b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨  b^{3, 148}_0
c  in DIMACS:
-6830 -6831  6832 -441  6833 0
-6830 -6831  6832 -441 -6834 0
-6830 -6831  6832 -441  6835 0

c  -1+1 --> 0
c    ( b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0 ∧  p_441) -> (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧ -b^{3, 148}_0)
c  in CNF:
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_2
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_1
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_0
c  in DIMACS:
-6830  6831 -6832 -441 -6833 0
-6830  6831 -6832 -441 -6834 0
-6830  6831 -6832 -441 -6835 0

c  0+1 --> 1
c    (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧  p_441) -> (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0)
c  in CNF:
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_2
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_1
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨  b^{3, 148}_0
c  in DIMACS:
 6830  6831  6832 -441 -6833 0
 6830  6831  6832 -441 -6834 0
 6830  6831  6832 -441  6835 0

c  1+1 --> 2
c    (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0 ∧  p_441) -> (-b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0)
c  in CNF:
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_2
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨  b^{3, 148}_1
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ -p_441 ∨ -b^{3, 148}_0
c  in DIMACS:
 6830  6831 -6832 -441 -6833 0
 6830  6831 -6832 -441  6834 0
 6830  6831 -6832 -441 -6835 0

c  2+1 --> break 
c    (-b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧  p_441) -> break
c  in CNF:
c     b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 6830 -6831  6832 -441 1162 0


c  2-1 --> 1
c    (-b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧ -p_441) -> (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0)
c  in CNF:
c     b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_2
c     b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_1
c     b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨  b^{3, 148}_0
c  in DIMACS:
 6830 -6831  6832  441 -6833 0
 6830 -6831  6832  441 -6834 0
 6830 -6831  6832  441  6835 0

c  1-1 --> 0
c    (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0 ∧ -p_441) -> (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧ -b^{3, 148}_0)
c  in CNF:
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_2
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_1
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_0
c  in DIMACS:
 6830  6831 -6832  441 -6833 0
 6830  6831 -6832  441 -6834 0
 6830  6831 -6832  441 -6835 0

c  0-1 --> -1
c    (-b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧ -p_441) -> ( b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0)
c  in CNF:
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨  b^{3, 148}_2
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_1
c     b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨  b^{3, 148}_0
c  in DIMACS:
 6830  6831  6832  441  6833 0
 6830  6831  6832  441 -6834 0
 6830  6831  6832  441  6835 0

c  -1-1 --> -2
c    ( b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧  b^{3, 147}_0 ∧ -p_441) -> ( b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0)
c  in CNF:
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨  b^{3, 148}_2
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨  b^{3, 148}_1
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨  p_441 ∨ -b^{3, 148}_0
c  in DIMACS:
-6830  6831 -6832  441  6833 0
-6830  6831 -6832  441  6834 0
-6830  6831 -6832  441 -6835 0

c  -2-1 --> break 
c    ( b^{3, 147}_2 ∧  b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨  b^{3, 147}_0 ∨  p_441 ∨ break
c  in DIMACS:
-6830 -6831  6832  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 147}_2 ∧ -b^{3, 147}_1 ∧ -b^{3, 147}_0 ∧ true) 
c  in CNF:
c    -b^{3, 147}_2 ∨  b^{3, 147}_1 ∨  b^{3, 147}_0 ∨ false 
c  in DIMACS:
-6830  6831  6832  0

c  3 does not represent an automaton state.
c    -(-b^{3, 147}_2 ∧  b^{3, 147}_1 ∧  b^{3, 147}_0 ∧ true) 
c  in CNF:
c     b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ false 
c  in DIMACS:
 6830 -6831 -6832  0
c  -3 does not represent an automaton state.
c    -( b^{3, 147}_2 ∧  b^{3, 147}_1 ∧  b^{3, 147}_0 ∧ true) 
c  in CNF:
c    -b^{3, 147}_2 ∨ -b^{3, 147}_1 ∨ -b^{3, 147}_0 ∨ false 
c  in DIMACS:
-6830 -6831 -6832  0

c i = 148
c  -2+1 --> -1
c    ( b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧  p_444) -> ( b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0)
c  in CNF:
c    -b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨  b^{3, 149}_2
c    -b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_1
c    -b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨  b^{3, 149}_0
c  in DIMACS:
-6833 -6834  6835 -444  6836 0
-6833 -6834  6835 -444 -6837 0
-6833 -6834  6835 -444  6838 0

c  -1+1 --> 0
c    ( b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0 ∧  p_444) -> (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧ -b^{3, 149}_0)
c  in CNF:
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_2
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_1
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_0
c  in DIMACS:
-6833  6834 -6835 -444 -6836 0
-6833  6834 -6835 -444 -6837 0
-6833  6834 -6835 -444 -6838 0

c  0+1 --> 1
c    (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧  p_444) -> (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0)
c  in CNF:
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_2
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_1
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨  b^{3, 149}_0
c  in DIMACS:
 6833  6834  6835 -444 -6836 0
 6833  6834  6835 -444 -6837 0
 6833  6834  6835 -444  6838 0

c  1+1 --> 2
c    (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0 ∧  p_444) -> (-b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0)
c  in CNF:
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_2
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨  b^{3, 149}_1
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ -p_444 ∨ -b^{3, 149}_0
c  in DIMACS:
 6833  6834 -6835 -444 -6836 0
 6833  6834 -6835 -444  6837 0
 6833  6834 -6835 -444 -6838 0

c  2+1 --> break 
c    (-b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧  p_444) -> break
c  in CNF:
c     b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 6833 -6834  6835 -444 1162 0


c  2-1 --> 1
c    (-b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧ -p_444) -> (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0)
c  in CNF:
c     b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_2
c     b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_1
c     b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨  b^{3, 149}_0
c  in DIMACS:
 6833 -6834  6835  444 -6836 0
 6833 -6834  6835  444 -6837 0
 6833 -6834  6835  444  6838 0

c  1-1 --> 0
c    (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0 ∧ -p_444) -> (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧ -b^{3, 149}_0)
c  in CNF:
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_2
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_1
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_0
c  in DIMACS:
 6833  6834 -6835  444 -6836 0
 6833  6834 -6835  444 -6837 0
 6833  6834 -6835  444 -6838 0

c  0-1 --> -1
c    (-b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧ -p_444) -> ( b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0)
c  in CNF:
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨  b^{3, 149}_2
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_1
c     b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨  b^{3, 149}_0
c  in DIMACS:
 6833  6834  6835  444  6836 0
 6833  6834  6835  444 -6837 0
 6833  6834  6835  444  6838 0

c  -1-1 --> -2
c    ( b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧  b^{3, 148}_0 ∧ -p_444) -> ( b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0)
c  in CNF:
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨  b^{3, 149}_2
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨  b^{3, 149}_1
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨  p_444 ∨ -b^{3, 149}_0
c  in DIMACS:
-6833  6834 -6835  444  6836 0
-6833  6834 -6835  444  6837 0
-6833  6834 -6835  444 -6838 0

c  -2-1 --> break 
c    ( b^{3, 148}_2 ∧  b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨  b^{3, 148}_0 ∨  p_444 ∨ break
c  in DIMACS:
-6833 -6834  6835  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 148}_2 ∧ -b^{3, 148}_1 ∧ -b^{3, 148}_0 ∧ true) 
c  in CNF:
c    -b^{3, 148}_2 ∨  b^{3, 148}_1 ∨  b^{3, 148}_0 ∨ false 
c  in DIMACS:
-6833  6834  6835  0

c  3 does not represent an automaton state.
c    -(-b^{3, 148}_2 ∧  b^{3, 148}_1 ∧  b^{3, 148}_0 ∧ true) 
c  in CNF:
c     b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ false 
c  in DIMACS:
 6833 -6834 -6835  0
c  -3 does not represent an automaton state.
c    -( b^{3, 148}_2 ∧  b^{3, 148}_1 ∧  b^{3, 148}_0 ∧ true) 
c  in CNF:
c    -b^{3, 148}_2 ∨ -b^{3, 148}_1 ∨ -b^{3, 148}_0 ∨ false 
c  in DIMACS:
-6833 -6834 -6835  0

c i = 149
c  -2+1 --> -1
c    ( b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧  p_447) -> ( b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0)
c  in CNF:
c    -b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨  b^{3, 150}_2
c    -b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_1
c    -b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨  b^{3, 150}_0
c  in DIMACS:
-6836 -6837  6838 -447  6839 0
-6836 -6837  6838 -447 -6840 0
-6836 -6837  6838 -447  6841 0

c  -1+1 --> 0
c    ( b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0 ∧  p_447) -> (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧ -b^{3, 150}_0)
c  in CNF:
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_2
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_1
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_0
c  in DIMACS:
-6836  6837 -6838 -447 -6839 0
-6836  6837 -6838 -447 -6840 0
-6836  6837 -6838 -447 -6841 0

c  0+1 --> 1
c    (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧  p_447) -> (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0)
c  in CNF:
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_2
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_1
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨  b^{3, 150}_0
c  in DIMACS:
 6836  6837  6838 -447 -6839 0
 6836  6837  6838 -447 -6840 0
 6836  6837  6838 -447  6841 0

c  1+1 --> 2
c    (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0 ∧  p_447) -> (-b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0)
c  in CNF:
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_2
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨  b^{3, 150}_1
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ -p_447 ∨ -b^{3, 150}_0
c  in DIMACS:
 6836  6837 -6838 -447 -6839 0
 6836  6837 -6838 -447  6840 0
 6836  6837 -6838 -447 -6841 0

c  2+1 --> break 
c    (-b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧  p_447) -> break
c  in CNF:
c     b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ -p_447 ∨ break
c  in DIMACS:
 6836 -6837  6838 -447 1162 0


c  2-1 --> 1
c    (-b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧ -p_447) -> (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0)
c  in CNF:
c     b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_2
c     b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_1
c     b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨  b^{3, 150}_0
c  in DIMACS:
 6836 -6837  6838  447 -6839 0
 6836 -6837  6838  447 -6840 0
 6836 -6837  6838  447  6841 0

c  1-1 --> 0
c    (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0 ∧ -p_447) -> (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧ -b^{3, 150}_0)
c  in CNF:
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_2
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_1
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_0
c  in DIMACS:
 6836  6837 -6838  447 -6839 0
 6836  6837 -6838  447 -6840 0
 6836  6837 -6838  447 -6841 0

c  0-1 --> -1
c    (-b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧ -p_447) -> ( b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0)
c  in CNF:
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨  b^{3, 150}_2
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_1
c     b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨  b^{3, 150}_0
c  in DIMACS:
 6836  6837  6838  447  6839 0
 6836  6837  6838  447 -6840 0
 6836  6837  6838  447  6841 0

c  -1-1 --> -2
c    ( b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧  b^{3, 149}_0 ∧ -p_447) -> ( b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0)
c  in CNF:
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨  b^{3, 150}_2
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨  b^{3, 150}_1
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨  p_447 ∨ -b^{3, 150}_0
c  in DIMACS:
-6836  6837 -6838  447  6839 0
-6836  6837 -6838  447  6840 0
-6836  6837 -6838  447 -6841 0

c  -2-1 --> break 
c    ( b^{3, 149}_2 ∧  b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧ -p_447) -> break
c  in CNF:
c    -b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨  b^{3, 149}_0 ∨  p_447 ∨ break
c  in DIMACS:
-6836 -6837  6838  447 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 149}_2 ∧ -b^{3, 149}_1 ∧ -b^{3, 149}_0 ∧ true) 
c  in CNF:
c    -b^{3, 149}_2 ∨  b^{3, 149}_1 ∨  b^{3, 149}_0 ∨ false 
c  in DIMACS:
-6836  6837  6838  0

c  3 does not represent an automaton state.
c    -(-b^{3, 149}_2 ∧  b^{3, 149}_1 ∧  b^{3, 149}_0 ∧ true) 
c  in CNF:
c     b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ false 
c  in DIMACS:
 6836 -6837 -6838  0
c  -3 does not represent an automaton state.
c    -( b^{3, 149}_2 ∧  b^{3, 149}_1 ∧  b^{3, 149}_0 ∧ true) 
c  in CNF:
c    -b^{3, 149}_2 ∨ -b^{3, 149}_1 ∨ -b^{3, 149}_0 ∨ false 
c  in DIMACS:
-6836 -6837 -6838  0

c i = 150
c  -2+1 --> -1
c    ( b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧  p_450) -> ( b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0)
c  in CNF:
c    -b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨  b^{3, 151}_2
c    -b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_1
c    -b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨  b^{3, 151}_0
c  in DIMACS:
-6839 -6840  6841 -450  6842 0
-6839 -6840  6841 -450 -6843 0
-6839 -6840  6841 -450  6844 0

c  -1+1 --> 0
c    ( b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0 ∧  p_450) -> (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧ -b^{3, 151}_0)
c  in CNF:
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_2
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_1
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_0
c  in DIMACS:
-6839  6840 -6841 -450 -6842 0
-6839  6840 -6841 -450 -6843 0
-6839  6840 -6841 -450 -6844 0

c  0+1 --> 1
c    (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧  p_450) -> (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0)
c  in CNF:
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_2
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_1
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨  b^{3, 151}_0
c  in DIMACS:
 6839  6840  6841 -450 -6842 0
 6839  6840  6841 -450 -6843 0
 6839  6840  6841 -450  6844 0

c  1+1 --> 2
c    (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0 ∧  p_450) -> (-b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0)
c  in CNF:
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_2
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨  b^{3, 151}_1
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ -p_450 ∨ -b^{3, 151}_0
c  in DIMACS:
 6839  6840 -6841 -450 -6842 0
 6839  6840 -6841 -450  6843 0
 6839  6840 -6841 -450 -6844 0

c  2+1 --> break 
c    (-b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧  p_450) -> break
c  in CNF:
c     b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 6839 -6840  6841 -450 1162 0


c  2-1 --> 1
c    (-b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧ -p_450) -> (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0)
c  in CNF:
c     b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_2
c     b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_1
c     b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨  b^{3, 151}_0
c  in DIMACS:
 6839 -6840  6841  450 -6842 0
 6839 -6840  6841  450 -6843 0
 6839 -6840  6841  450  6844 0

c  1-1 --> 0
c    (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0 ∧ -p_450) -> (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧ -b^{3, 151}_0)
c  in CNF:
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_2
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_1
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_0
c  in DIMACS:
 6839  6840 -6841  450 -6842 0
 6839  6840 -6841  450 -6843 0
 6839  6840 -6841  450 -6844 0

c  0-1 --> -1
c    (-b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧ -p_450) -> ( b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0)
c  in CNF:
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨  b^{3, 151}_2
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_1
c     b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨  b^{3, 151}_0
c  in DIMACS:
 6839  6840  6841  450  6842 0
 6839  6840  6841  450 -6843 0
 6839  6840  6841  450  6844 0

c  -1-1 --> -2
c    ( b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧  b^{3, 150}_0 ∧ -p_450) -> ( b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0)
c  in CNF:
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨  b^{3, 151}_2
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨  b^{3, 151}_1
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨  p_450 ∨ -b^{3, 151}_0
c  in DIMACS:
-6839  6840 -6841  450  6842 0
-6839  6840 -6841  450  6843 0
-6839  6840 -6841  450 -6844 0

c  -2-1 --> break 
c    ( b^{3, 150}_2 ∧  b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨  b^{3, 150}_0 ∨  p_450 ∨ break
c  in DIMACS:
-6839 -6840  6841  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 150}_2 ∧ -b^{3, 150}_1 ∧ -b^{3, 150}_0 ∧ true) 
c  in CNF:
c    -b^{3, 150}_2 ∨  b^{3, 150}_1 ∨  b^{3, 150}_0 ∨ false 
c  in DIMACS:
-6839  6840  6841  0

c  3 does not represent an automaton state.
c    -(-b^{3, 150}_2 ∧  b^{3, 150}_1 ∧  b^{3, 150}_0 ∧ true) 
c  in CNF:
c     b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ false 
c  in DIMACS:
 6839 -6840 -6841  0
c  -3 does not represent an automaton state.
c    -( b^{3, 150}_2 ∧  b^{3, 150}_1 ∧  b^{3, 150}_0 ∧ true) 
c  in CNF:
c    -b^{3, 150}_2 ∨ -b^{3, 150}_1 ∨ -b^{3, 150}_0 ∨ false 
c  in DIMACS:
-6839 -6840 -6841  0

c i = 151
c  -2+1 --> -1
c    ( b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧  p_453) -> ( b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0)
c  in CNF:
c    -b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨  b^{3, 152}_2
c    -b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_1
c    -b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨  b^{3, 152}_0
c  in DIMACS:
-6842 -6843  6844 -453  6845 0
-6842 -6843  6844 -453 -6846 0
-6842 -6843  6844 -453  6847 0

c  -1+1 --> 0
c    ( b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0 ∧  p_453) -> (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧ -b^{3, 152}_0)
c  in CNF:
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_2
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_1
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_0
c  in DIMACS:
-6842  6843 -6844 -453 -6845 0
-6842  6843 -6844 -453 -6846 0
-6842  6843 -6844 -453 -6847 0

c  0+1 --> 1
c    (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧  p_453) -> (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0)
c  in CNF:
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_2
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_1
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨  b^{3, 152}_0
c  in DIMACS:
 6842  6843  6844 -453 -6845 0
 6842  6843  6844 -453 -6846 0
 6842  6843  6844 -453  6847 0

c  1+1 --> 2
c    (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0 ∧  p_453) -> (-b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0)
c  in CNF:
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_2
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨  b^{3, 152}_1
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ -p_453 ∨ -b^{3, 152}_0
c  in DIMACS:
 6842  6843 -6844 -453 -6845 0
 6842  6843 -6844 -453  6846 0
 6842  6843 -6844 -453 -6847 0

c  2+1 --> break 
c    (-b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧  p_453) -> break
c  in CNF:
c     b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ -p_453 ∨ break
c  in DIMACS:
 6842 -6843  6844 -453 1162 0


c  2-1 --> 1
c    (-b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧ -p_453) -> (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0)
c  in CNF:
c     b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_2
c     b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_1
c     b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨  b^{3, 152}_0
c  in DIMACS:
 6842 -6843  6844  453 -6845 0
 6842 -6843  6844  453 -6846 0
 6842 -6843  6844  453  6847 0

c  1-1 --> 0
c    (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0 ∧ -p_453) -> (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧ -b^{3, 152}_0)
c  in CNF:
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_2
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_1
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_0
c  in DIMACS:
 6842  6843 -6844  453 -6845 0
 6842  6843 -6844  453 -6846 0
 6842  6843 -6844  453 -6847 0

c  0-1 --> -1
c    (-b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧ -p_453) -> ( b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0)
c  in CNF:
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨  b^{3, 152}_2
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_1
c     b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨  b^{3, 152}_0
c  in DIMACS:
 6842  6843  6844  453  6845 0
 6842  6843  6844  453 -6846 0
 6842  6843  6844  453  6847 0

c  -1-1 --> -2
c    ( b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧  b^{3, 151}_0 ∧ -p_453) -> ( b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0)
c  in CNF:
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨  b^{3, 152}_2
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨  b^{3, 152}_1
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨  p_453 ∨ -b^{3, 152}_0
c  in DIMACS:
-6842  6843 -6844  453  6845 0
-6842  6843 -6844  453  6846 0
-6842  6843 -6844  453 -6847 0

c  -2-1 --> break 
c    ( b^{3, 151}_2 ∧  b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧ -p_453) -> break
c  in CNF:
c    -b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨  b^{3, 151}_0 ∨  p_453 ∨ break
c  in DIMACS:
-6842 -6843  6844  453 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 151}_2 ∧ -b^{3, 151}_1 ∧ -b^{3, 151}_0 ∧ true) 
c  in CNF:
c    -b^{3, 151}_2 ∨  b^{3, 151}_1 ∨  b^{3, 151}_0 ∨ false 
c  in DIMACS:
-6842  6843  6844  0

c  3 does not represent an automaton state.
c    -(-b^{3, 151}_2 ∧  b^{3, 151}_1 ∧  b^{3, 151}_0 ∧ true) 
c  in CNF:
c     b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ false 
c  in DIMACS:
 6842 -6843 -6844  0
c  -3 does not represent an automaton state.
c    -( b^{3, 151}_2 ∧  b^{3, 151}_1 ∧  b^{3, 151}_0 ∧ true) 
c  in CNF:
c    -b^{3, 151}_2 ∨ -b^{3, 151}_1 ∨ -b^{3, 151}_0 ∨ false 
c  in DIMACS:
-6842 -6843 -6844  0

c i = 152
c  -2+1 --> -1
c    ( b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧  p_456) -> ( b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0)
c  in CNF:
c    -b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨  b^{3, 153}_2
c    -b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_1
c    -b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨  b^{3, 153}_0
c  in DIMACS:
-6845 -6846  6847 -456  6848 0
-6845 -6846  6847 -456 -6849 0
-6845 -6846  6847 -456  6850 0

c  -1+1 --> 0
c    ( b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0 ∧  p_456) -> (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧ -b^{3, 153}_0)
c  in CNF:
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_2
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_1
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_0
c  in DIMACS:
-6845  6846 -6847 -456 -6848 0
-6845  6846 -6847 -456 -6849 0
-6845  6846 -6847 -456 -6850 0

c  0+1 --> 1
c    (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧  p_456) -> (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0)
c  in CNF:
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_2
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_1
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨  b^{3, 153}_0
c  in DIMACS:
 6845  6846  6847 -456 -6848 0
 6845  6846  6847 -456 -6849 0
 6845  6846  6847 -456  6850 0

c  1+1 --> 2
c    (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0 ∧  p_456) -> (-b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0)
c  in CNF:
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_2
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨  b^{3, 153}_1
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ -p_456 ∨ -b^{3, 153}_0
c  in DIMACS:
 6845  6846 -6847 -456 -6848 0
 6845  6846 -6847 -456  6849 0
 6845  6846 -6847 -456 -6850 0

c  2+1 --> break 
c    (-b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧  p_456) -> break
c  in CNF:
c     b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 6845 -6846  6847 -456 1162 0


c  2-1 --> 1
c    (-b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧ -p_456) -> (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0)
c  in CNF:
c     b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_2
c     b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_1
c     b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨  b^{3, 153}_0
c  in DIMACS:
 6845 -6846  6847  456 -6848 0
 6845 -6846  6847  456 -6849 0
 6845 -6846  6847  456  6850 0

c  1-1 --> 0
c    (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0 ∧ -p_456) -> (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧ -b^{3, 153}_0)
c  in CNF:
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_2
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_1
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_0
c  in DIMACS:
 6845  6846 -6847  456 -6848 0
 6845  6846 -6847  456 -6849 0
 6845  6846 -6847  456 -6850 0

c  0-1 --> -1
c    (-b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧ -p_456) -> ( b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0)
c  in CNF:
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨  b^{3, 153}_2
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_1
c     b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨  b^{3, 153}_0
c  in DIMACS:
 6845  6846  6847  456  6848 0
 6845  6846  6847  456 -6849 0
 6845  6846  6847  456  6850 0

c  -1-1 --> -2
c    ( b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧  b^{3, 152}_0 ∧ -p_456) -> ( b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0)
c  in CNF:
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨  b^{3, 153}_2
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨  b^{3, 153}_1
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨  p_456 ∨ -b^{3, 153}_0
c  in DIMACS:
-6845  6846 -6847  456  6848 0
-6845  6846 -6847  456  6849 0
-6845  6846 -6847  456 -6850 0

c  -2-1 --> break 
c    ( b^{3, 152}_2 ∧  b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨  b^{3, 152}_0 ∨  p_456 ∨ break
c  in DIMACS:
-6845 -6846  6847  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 152}_2 ∧ -b^{3, 152}_1 ∧ -b^{3, 152}_0 ∧ true) 
c  in CNF:
c    -b^{3, 152}_2 ∨  b^{3, 152}_1 ∨  b^{3, 152}_0 ∨ false 
c  in DIMACS:
-6845  6846  6847  0

c  3 does not represent an automaton state.
c    -(-b^{3, 152}_2 ∧  b^{3, 152}_1 ∧  b^{3, 152}_0 ∧ true) 
c  in CNF:
c     b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ false 
c  in DIMACS:
 6845 -6846 -6847  0
c  -3 does not represent an automaton state.
c    -( b^{3, 152}_2 ∧  b^{3, 152}_1 ∧  b^{3, 152}_0 ∧ true) 
c  in CNF:
c    -b^{3, 152}_2 ∨ -b^{3, 152}_1 ∨ -b^{3, 152}_0 ∨ false 
c  in DIMACS:
-6845 -6846 -6847  0

c i = 153
c  -2+1 --> -1
c    ( b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧  p_459) -> ( b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0)
c  in CNF:
c    -b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨  b^{3, 154}_2
c    -b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_1
c    -b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨  b^{3, 154}_0
c  in DIMACS:
-6848 -6849  6850 -459  6851 0
-6848 -6849  6850 -459 -6852 0
-6848 -6849  6850 -459  6853 0

c  -1+1 --> 0
c    ( b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0 ∧  p_459) -> (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧ -b^{3, 154}_0)
c  in CNF:
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_2
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_1
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_0
c  in DIMACS:
-6848  6849 -6850 -459 -6851 0
-6848  6849 -6850 -459 -6852 0
-6848  6849 -6850 -459 -6853 0

c  0+1 --> 1
c    (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧  p_459) -> (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0)
c  in CNF:
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_2
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_1
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨  b^{3, 154}_0
c  in DIMACS:
 6848  6849  6850 -459 -6851 0
 6848  6849  6850 -459 -6852 0
 6848  6849  6850 -459  6853 0

c  1+1 --> 2
c    (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0 ∧  p_459) -> (-b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0)
c  in CNF:
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_2
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨  b^{3, 154}_1
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ -p_459 ∨ -b^{3, 154}_0
c  in DIMACS:
 6848  6849 -6850 -459 -6851 0
 6848  6849 -6850 -459  6852 0
 6848  6849 -6850 -459 -6853 0

c  2+1 --> break 
c    (-b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧  p_459) -> break
c  in CNF:
c     b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 6848 -6849  6850 -459 1162 0


c  2-1 --> 1
c    (-b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧ -p_459) -> (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0)
c  in CNF:
c     b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_2
c     b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_1
c     b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨  b^{3, 154}_0
c  in DIMACS:
 6848 -6849  6850  459 -6851 0
 6848 -6849  6850  459 -6852 0
 6848 -6849  6850  459  6853 0

c  1-1 --> 0
c    (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0 ∧ -p_459) -> (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧ -b^{3, 154}_0)
c  in CNF:
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_2
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_1
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_0
c  in DIMACS:
 6848  6849 -6850  459 -6851 0
 6848  6849 -6850  459 -6852 0
 6848  6849 -6850  459 -6853 0

c  0-1 --> -1
c    (-b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧ -p_459) -> ( b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0)
c  in CNF:
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨  b^{3, 154}_2
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_1
c     b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨  b^{3, 154}_0
c  in DIMACS:
 6848  6849  6850  459  6851 0
 6848  6849  6850  459 -6852 0
 6848  6849  6850  459  6853 0

c  -1-1 --> -2
c    ( b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧  b^{3, 153}_0 ∧ -p_459) -> ( b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0)
c  in CNF:
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨  b^{3, 154}_2
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨  b^{3, 154}_1
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨  p_459 ∨ -b^{3, 154}_0
c  in DIMACS:
-6848  6849 -6850  459  6851 0
-6848  6849 -6850  459  6852 0
-6848  6849 -6850  459 -6853 0

c  -2-1 --> break 
c    ( b^{3, 153}_2 ∧  b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨  b^{3, 153}_0 ∨  p_459 ∨ break
c  in DIMACS:
-6848 -6849  6850  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 153}_2 ∧ -b^{3, 153}_1 ∧ -b^{3, 153}_0 ∧ true) 
c  in CNF:
c    -b^{3, 153}_2 ∨  b^{3, 153}_1 ∨  b^{3, 153}_0 ∨ false 
c  in DIMACS:
-6848  6849  6850  0

c  3 does not represent an automaton state.
c    -(-b^{3, 153}_2 ∧  b^{3, 153}_1 ∧  b^{3, 153}_0 ∧ true) 
c  in CNF:
c     b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ false 
c  in DIMACS:
 6848 -6849 -6850  0
c  -3 does not represent an automaton state.
c    -( b^{3, 153}_2 ∧  b^{3, 153}_1 ∧  b^{3, 153}_0 ∧ true) 
c  in CNF:
c    -b^{3, 153}_2 ∨ -b^{3, 153}_1 ∨ -b^{3, 153}_0 ∨ false 
c  in DIMACS:
-6848 -6849 -6850  0

c i = 154
c  -2+1 --> -1
c    ( b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧  p_462) -> ( b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0)
c  in CNF:
c    -b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨  b^{3, 155}_2
c    -b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_1
c    -b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨  b^{3, 155}_0
c  in DIMACS:
-6851 -6852  6853 -462  6854 0
-6851 -6852  6853 -462 -6855 0
-6851 -6852  6853 -462  6856 0

c  -1+1 --> 0
c    ( b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0 ∧  p_462) -> (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧ -b^{3, 155}_0)
c  in CNF:
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_2
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_1
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_0
c  in DIMACS:
-6851  6852 -6853 -462 -6854 0
-6851  6852 -6853 -462 -6855 0
-6851  6852 -6853 -462 -6856 0

c  0+1 --> 1
c    (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧  p_462) -> (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0)
c  in CNF:
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_2
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_1
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨  b^{3, 155}_0
c  in DIMACS:
 6851  6852  6853 -462 -6854 0
 6851  6852  6853 -462 -6855 0
 6851  6852  6853 -462  6856 0

c  1+1 --> 2
c    (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0 ∧  p_462) -> (-b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0)
c  in CNF:
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_2
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨  b^{3, 155}_1
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ -p_462 ∨ -b^{3, 155}_0
c  in DIMACS:
 6851  6852 -6853 -462 -6854 0
 6851  6852 -6853 -462  6855 0
 6851  6852 -6853 -462 -6856 0

c  2+1 --> break 
c    (-b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧  p_462) -> break
c  in CNF:
c     b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 6851 -6852  6853 -462 1162 0


c  2-1 --> 1
c    (-b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧ -p_462) -> (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0)
c  in CNF:
c     b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_2
c     b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_1
c     b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨  b^{3, 155}_0
c  in DIMACS:
 6851 -6852  6853  462 -6854 0
 6851 -6852  6853  462 -6855 0
 6851 -6852  6853  462  6856 0

c  1-1 --> 0
c    (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0 ∧ -p_462) -> (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧ -b^{3, 155}_0)
c  in CNF:
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_2
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_1
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_0
c  in DIMACS:
 6851  6852 -6853  462 -6854 0
 6851  6852 -6853  462 -6855 0
 6851  6852 -6853  462 -6856 0

c  0-1 --> -1
c    (-b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧ -p_462) -> ( b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0)
c  in CNF:
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨  b^{3, 155}_2
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_1
c     b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨  b^{3, 155}_0
c  in DIMACS:
 6851  6852  6853  462  6854 0
 6851  6852  6853  462 -6855 0
 6851  6852  6853  462  6856 0

c  -1-1 --> -2
c    ( b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧  b^{3, 154}_0 ∧ -p_462) -> ( b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0)
c  in CNF:
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨  b^{3, 155}_2
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨  b^{3, 155}_1
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨  p_462 ∨ -b^{3, 155}_0
c  in DIMACS:
-6851  6852 -6853  462  6854 0
-6851  6852 -6853  462  6855 0
-6851  6852 -6853  462 -6856 0

c  -2-1 --> break 
c    ( b^{3, 154}_2 ∧  b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨  b^{3, 154}_0 ∨  p_462 ∨ break
c  in DIMACS:
-6851 -6852  6853  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 154}_2 ∧ -b^{3, 154}_1 ∧ -b^{3, 154}_0 ∧ true) 
c  in CNF:
c    -b^{3, 154}_2 ∨  b^{3, 154}_1 ∨  b^{3, 154}_0 ∨ false 
c  in DIMACS:
-6851  6852  6853  0

c  3 does not represent an automaton state.
c    -(-b^{3, 154}_2 ∧  b^{3, 154}_1 ∧  b^{3, 154}_0 ∧ true) 
c  in CNF:
c     b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ false 
c  in DIMACS:
 6851 -6852 -6853  0
c  -3 does not represent an automaton state.
c    -( b^{3, 154}_2 ∧  b^{3, 154}_1 ∧  b^{3, 154}_0 ∧ true) 
c  in CNF:
c    -b^{3, 154}_2 ∨ -b^{3, 154}_1 ∨ -b^{3, 154}_0 ∨ false 
c  in DIMACS:
-6851 -6852 -6853  0

c i = 155
c  -2+1 --> -1
c    ( b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧  p_465) -> ( b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0)
c  in CNF:
c    -b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨  b^{3, 156}_2
c    -b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_1
c    -b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨  b^{3, 156}_0
c  in DIMACS:
-6854 -6855  6856 -465  6857 0
-6854 -6855  6856 -465 -6858 0
-6854 -6855  6856 -465  6859 0

c  -1+1 --> 0
c    ( b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0 ∧  p_465) -> (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧ -b^{3, 156}_0)
c  in CNF:
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_2
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_1
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_0
c  in DIMACS:
-6854  6855 -6856 -465 -6857 0
-6854  6855 -6856 -465 -6858 0
-6854  6855 -6856 -465 -6859 0

c  0+1 --> 1
c    (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧  p_465) -> (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0)
c  in CNF:
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_2
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_1
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨  b^{3, 156}_0
c  in DIMACS:
 6854  6855  6856 -465 -6857 0
 6854  6855  6856 -465 -6858 0
 6854  6855  6856 -465  6859 0

c  1+1 --> 2
c    (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0 ∧  p_465) -> (-b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0)
c  in CNF:
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_2
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨  b^{3, 156}_1
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ -p_465 ∨ -b^{3, 156}_0
c  in DIMACS:
 6854  6855 -6856 -465 -6857 0
 6854  6855 -6856 -465  6858 0
 6854  6855 -6856 -465 -6859 0

c  2+1 --> break 
c    (-b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧  p_465) -> break
c  in CNF:
c     b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 6854 -6855  6856 -465 1162 0


c  2-1 --> 1
c    (-b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧ -p_465) -> (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0)
c  in CNF:
c     b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_2
c     b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_1
c     b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨  b^{3, 156}_0
c  in DIMACS:
 6854 -6855  6856  465 -6857 0
 6854 -6855  6856  465 -6858 0
 6854 -6855  6856  465  6859 0

c  1-1 --> 0
c    (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0 ∧ -p_465) -> (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧ -b^{3, 156}_0)
c  in CNF:
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_2
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_1
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_0
c  in DIMACS:
 6854  6855 -6856  465 -6857 0
 6854  6855 -6856  465 -6858 0
 6854  6855 -6856  465 -6859 0

c  0-1 --> -1
c    (-b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧ -p_465) -> ( b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0)
c  in CNF:
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨  b^{3, 156}_2
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_1
c     b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨  b^{3, 156}_0
c  in DIMACS:
 6854  6855  6856  465  6857 0
 6854  6855  6856  465 -6858 0
 6854  6855  6856  465  6859 0

c  -1-1 --> -2
c    ( b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧  b^{3, 155}_0 ∧ -p_465) -> ( b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0)
c  in CNF:
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨  b^{3, 156}_2
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨  b^{3, 156}_1
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨  p_465 ∨ -b^{3, 156}_0
c  in DIMACS:
-6854  6855 -6856  465  6857 0
-6854  6855 -6856  465  6858 0
-6854  6855 -6856  465 -6859 0

c  -2-1 --> break 
c    ( b^{3, 155}_2 ∧  b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨  b^{3, 155}_0 ∨  p_465 ∨ break
c  in DIMACS:
-6854 -6855  6856  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 155}_2 ∧ -b^{3, 155}_1 ∧ -b^{3, 155}_0 ∧ true) 
c  in CNF:
c    -b^{3, 155}_2 ∨  b^{3, 155}_1 ∨  b^{3, 155}_0 ∨ false 
c  in DIMACS:
-6854  6855  6856  0

c  3 does not represent an automaton state.
c    -(-b^{3, 155}_2 ∧  b^{3, 155}_1 ∧  b^{3, 155}_0 ∧ true) 
c  in CNF:
c     b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ false 
c  in DIMACS:
 6854 -6855 -6856  0
c  -3 does not represent an automaton state.
c    -( b^{3, 155}_2 ∧  b^{3, 155}_1 ∧  b^{3, 155}_0 ∧ true) 
c  in CNF:
c    -b^{3, 155}_2 ∨ -b^{3, 155}_1 ∨ -b^{3, 155}_0 ∨ false 
c  in DIMACS:
-6854 -6855 -6856  0

c i = 156
c  -2+1 --> -1
c    ( b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧  p_468) -> ( b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0)
c  in CNF:
c    -b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨  b^{3, 157}_2
c    -b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_1
c    -b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨  b^{3, 157}_0
c  in DIMACS:
-6857 -6858  6859 -468  6860 0
-6857 -6858  6859 -468 -6861 0
-6857 -6858  6859 -468  6862 0

c  -1+1 --> 0
c    ( b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0 ∧  p_468) -> (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧ -b^{3, 157}_0)
c  in CNF:
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_2
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_1
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_0
c  in DIMACS:
-6857  6858 -6859 -468 -6860 0
-6857  6858 -6859 -468 -6861 0
-6857  6858 -6859 -468 -6862 0

c  0+1 --> 1
c    (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧  p_468) -> (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0)
c  in CNF:
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_2
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_1
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨  b^{3, 157}_0
c  in DIMACS:
 6857  6858  6859 -468 -6860 0
 6857  6858  6859 -468 -6861 0
 6857  6858  6859 -468  6862 0

c  1+1 --> 2
c    (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0 ∧  p_468) -> (-b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0)
c  in CNF:
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_2
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨  b^{3, 157}_1
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ -p_468 ∨ -b^{3, 157}_0
c  in DIMACS:
 6857  6858 -6859 -468 -6860 0
 6857  6858 -6859 -468  6861 0
 6857  6858 -6859 -468 -6862 0

c  2+1 --> break 
c    (-b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧  p_468) -> break
c  in CNF:
c     b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 6857 -6858  6859 -468 1162 0


c  2-1 --> 1
c    (-b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧ -p_468) -> (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0)
c  in CNF:
c     b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_2
c     b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_1
c     b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨  b^{3, 157}_0
c  in DIMACS:
 6857 -6858  6859  468 -6860 0
 6857 -6858  6859  468 -6861 0
 6857 -6858  6859  468  6862 0

c  1-1 --> 0
c    (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0 ∧ -p_468) -> (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧ -b^{3, 157}_0)
c  in CNF:
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_2
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_1
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_0
c  in DIMACS:
 6857  6858 -6859  468 -6860 0
 6857  6858 -6859  468 -6861 0
 6857  6858 -6859  468 -6862 0

c  0-1 --> -1
c    (-b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧ -p_468) -> ( b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0)
c  in CNF:
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨  b^{3, 157}_2
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_1
c     b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨  b^{3, 157}_0
c  in DIMACS:
 6857  6858  6859  468  6860 0
 6857  6858  6859  468 -6861 0
 6857  6858  6859  468  6862 0

c  -1-1 --> -2
c    ( b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧  b^{3, 156}_0 ∧ -p_468) -> ( b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0)
c  in CNF:
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨  b^{3, 157}_2
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨  b^{3, 157}_1
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨  p_468 ∨ -b^{3, 157}_0
c  in DIMACS:
-6857  6858 -6859  468  6860 0
-6857  6858 -6859  468  6861 0
-6857  6858 -6859  468 -6862 0

c  -2-1 --> break 
c    ( b^{3, 156}_2 ∧  b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨  b^{3, 156}_0 ∨  p_468 ∨ break
c  in DIMACS:
-6857 -6858  6859  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 156}_2 ∧ -b^{3, 156}_1 ∧ -b^{3, 156}_0 ∧ true) 
c  in CNF:
c    -b^{3, 156}_2 ∨  b^{3, 156}_1 ∨  b^{3, 156}_0 ∨ false 
c  in DIMACS:
-6857  6858  6859  0

c  3 does not represent an automaton state.
c    -(-b^{3, 156}_2 ∧  b^{3, 156}_1 ∧  b^{3, 156}_0 ∧ true) 
c  in CNF:
c     b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ false 
c  in DIMACS:
 6857 -6858 -6859  0
c  -3 does not represent an automaton state.
c    -( b^{3, 156}_2 ∧  b^{3, 156}_1 ∧  b^{3, 156}_0 ∧ true) 
c  in CNF:
c    -b^{3, 156}_2 ∨ -b^{3, 156}_1 ∨ -b^{3, 156}_0 ∨ false 
c  in DIMACS:
-6857 -6858 -6859  0

c i = 157
c  -2+1 --> -1
c    ( b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧  p_471) -> ( b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0)
c  in CNF:
c    -b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨  b^{3, 158}_2
c    -b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_1
c    -b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨  b^{3, 158}_0
c  in DIMACS:
-6860 -6861  6862 -471  6863 0
-6860 -6861  6862 -471 -6864 0
-6860 -6861  6862 -471  6865 0

c  -1+1 --> 0
c    ( b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0 ∧  p_471) -> (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧ -b^{3, 158}_0)
c  in CNF:
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_2
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_1
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_0
c  in DIMACS:
-6860  6861 -6862 -471 -6863 0
-6860  6861 -6862 -471 -6864 0
-6860  6861 -6862 -471 -6865 0

c  0+1 --> 1
c    (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧  p_471) -> (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0)
c  in CNF:
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_2
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_1
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨  b^{3, 158}_0
c  in DIMACS:
 6860  6861  6862 -471 -6863 0
 6860  6861  6862 -471 -6864 0
 6860  6861  6862 -471  6865 0

c  1+1 --> 2
c    (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0 ∧  p_471) -> (-b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0)
c  in CNF:
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_2
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨  b^{3, 158}_1
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ -p_471 ∨ -b^{3, 158}_0
c  in DIMACS:
 6860  6861 -6862 -471 -6863 0
 6860  6861 -6862 -471  6864 0
 6860  6861 -6862 -471 -6865 0

c  2+1 --> break 
c    (-b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧  p_471) -> break
c  in CNF:
c     b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ -p_471 ∨ break
c  in DIMACS:
 6860 -6861  6862 -471 1162 0


c  2-1 --> 1
c    (-b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧ -p_471) -> (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0)
c  in CNF:
c     b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_2
c     b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_1
c     b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨  b^{3, 158}_0
c  in DIMACS:
 6860 -6861  6862  471 -6863 0
 6860 -6861  6862  471 -6864 0
 6860 -6861  6862  471  6865 0

c  1-1 --> 0
c    (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0 ∧ -p_471) -> (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧ -b^{3, 158}_0)
c  in CNF:
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_2
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_1
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_0
c  in DIMACS:
 6860  6861 -6862  471 -6863 0
 6860  6861 -6862  471 -6864 0
 6860  6861 -6862  471 -6865 0

c  0-1 --> -1
c    (-b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧ -p_471) -> ( b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0)
c  in CNF:
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨  b^{3, 158}_2
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_1
c     b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨  b^{3, 158}_0
c  in DIMACS:
 6860  6861  6862  471  6863 0
 6860  6861  6862  471 -6864 0
 6860  6861  6862  471  6865 0

c  -1-1 --> -2
c    ( b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧  b^{3, 157}_0 ∧ -p_471) -> ( b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0)
c  in CNF:
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨  b^{3, 158}_2
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨  b^{3, 158}_1
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨  p_471 ∨ -b^{3, 158}_0
c  in DIMACS:
-6860  6861 -6862  471  6863 0
-6860  6861 -6862  471  6864 0
-6860  6861 -6862  471 -6865 0

c  -2-1 --> break 
c    ( b^{3, 157}_2 ∧  b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧ -p_471) -> break
c  in CNF:
c    -b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨  b^{3, 157}_0 ∨  p_471 ∨ break
c  in DIMACS:
-6860 -6861  6862  471 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 157}_2 ∧ -b^{3, 157}_1 ∧ -b^{3, 157}_0 ∧ true) 
c  in CNF:
c    -b^{3, 157}_2 ∨  b^{3, 157}_1 ∨  b^{3, 157}_0 ∨ false 
c  in DIMACS:
-6860  6861  6862  0

c  3 does not represent an automaton state.
c    -(-b^{3, 157}_2 ∧  b^{3, 157}_1 ∧  b^{3, 157}_0 ∧ true) 
c  in CNF:
c     b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ false 
c  in DIMACS:
 6860 -6861 -6862  0
c  -3 does not represent an automaton state.
c    -( b^{3, 157}_2 ∧  b^{3, 157}_1 ∧  b^{3, 157}_0 ∧ true) 
c  in CNF:
c    -b^{3, 157}_2 ∨ -b^{3, 157}_1 ∨ -b^{3, 157}_0 ∨ false 
c  in DIMACS:
-6860 -6861 -6862  0

c i = 158
c  -2+1 --> -1
c    ( b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧  p_474) -> ( b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0)
c  in CNF:
c    -b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨  b^{3, 159}_2
c    -b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_1
c    -b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨  b^{3, 159}_0
c  in DIMACS:
-6863 -6864  6865 -474  6866 0
-6863 -6864  6865 -474 -6867 0
-6863 -6864  6865 -474  6868 0

c  -1+1 --> 0
c    ( b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0 ∧  p_474) -> (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧ -b^{3, 159}_0)
c  in CNF:
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_2
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_1
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_0
c  in DIMACS:
-6863  6864 -6865 -474 -6866 0
-6863  6864 -6865 -474 -6867 0
-6863  6864 -6865 -474 -6868 0

c  0+1 --> 1
c    (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧  p_474) -> (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0)
c  in CNF:
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_2
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_1
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨  b^{3, 159}_0
c  in DIMACS:
 6863  6864  6865 -474 -6866 0
 6863  6864  6865 -474 -6867 0
 6863  6864  6865 -474  6868 0

c  1+1 --> 2
c    (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0 ∧  p_474) -> (-b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0)
c  in CNF:
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_2
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨  b^{3, 159}_1
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ -p_474 ∨ -b^{3, 159}_0
c  in DIMACS:
 6863  6864 -6865 -474 -6866 0
 6863  6864 -6865 -474  6867 0
 6863  6864 -6865 -474 -6868 0

c  2+1 --> break 
c    (-b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧  p_474) -> break
c  in CNF:
c     b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 6863 -6864  6865 -474 1162 0


c  2-1 --> 1
c    (-b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧ -p_474) -> (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0)
c  in CNF:
c     b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_2
c     b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_1
c     b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨  b^{3, 159}_0
c  in DIMACS:
 6863 -6864  6865  474 -6866 0
 6863 -6864  6865  474 -6867 0
 6863 -6864  6865  474  6868 0

c  1-1 --> 0
c    (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0 ∧ -p_474) -> (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧ -b^{3, 159}_0)
c  in CNF:
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_2
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_1
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_0
c  in DIMACS:
 6863  6864 -6865  474 -6866 0
 6863  6864 -6865  474 -6867 0
 6863  6864 -6865  474 -6868 0

c  0-1 --> -1
c    (-b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧ -p_474) -> ( b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0)
c  in CNF:
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨  b^{3, 159}_2
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_1
c     b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨  b^{3, 159}_0
c  in DIMACS:
 6863  6864  6865  474  6866 0
 6863  6864  6865  474 -6867 0
 6863  6864  6865  474  6868 0

c  -1-1 --> -2
c    ( b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧  b^{3, 158}_0 ∧ -p_474) -> ( b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0)
c  in CNF:
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨  b^{3, 159}_2
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨  b^{3, 159}_1
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨  p_474 ∨ -b^{3, 159}_0
c  in DIMACS:
-6863  6864 -6865  474  6866 0
-6863  6864 -6865  474  6867 0
-6863  6864 -6865  474 -6868 0

c  -2-1 --> break 
c    ( b^{3, 158}_2 ∧  b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨  b^{3, 158}_0 ∨  p_474 ∨ break
c  in DIMACS:
-6863 -6864  6865  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 158}_2 ∧ -b^{3, 158}_1 ∧ -b^{3, 158}_0 ∧ true) 
c  in CNF:
c    -b^{3, 158}_2 ∨  b^{3, 158}_1 ∨  b^{3, 158}_0 ∨ false 
c  in DIMACS:
-6863  6864  6865  0

c  3 does not represent an automaton state.
c    -(-b^{3, 158}_2 ∧  b^{3, 158}_1 ∧  b^{3, 158}_0 ∧ true) 
c  in CNF:
c     b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ false 
c  in DIMACS:
 6863 -6864 -6865  0
c  -3 does not represent an automaton state.
c    -( b^{3, 158}_2 ∧  b^{3, 158}_1 ∧  b^{3, 158}_0 ∧ true) 
c  in CNF:
c    -b^{3, 158}_2 ∨ -b^{3, 158}_1 ∨ -b^{3, 158}_0 ∨ false 
c  in DIMACS:
-6863 -6864 -6865  0

c i = 159
c  -2+1 --> -1
c    ( b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧  p_477) -> ( b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0)
c  in CNF:
c    -b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨  b^{3, 160}_2
c    -b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_1
c    -b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨  b^{3, 160}_0
c  in DIMACS:
-6866 -6867  6868 -477  6869 0
-6866 -6867  6868 -477 -6870 0
-6866 -6867  6868 -477  6871 0

c  -1+1 --> 0
c    ( b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0 ∧  p_477) -> (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧ -b^{3, 160}_0)
c  in CNF:
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_2
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_1
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_0
c  in DIMACS:
-6866  6867 -6868 -477 -6869 0
-6866  6867 -6868 -477 -6870 0
-6866  6867 -6868 -477 -6871 0

c  0+1 --> 1
c    (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧  p_477) -> (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0)
c  in CNF:
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_2
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_1
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨  b^{3, 160}_0
c  in DIMACS:
 6866  6867  6868 -477 -6869 0
 6866  6867  6868 -477 -6870 0
 6866  6867  6868 -477  6871 0

c  1+1 --> 2
c    (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0 ∧  p_477) -> (-b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0)
c  in CNF:
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_2
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨  b^{3, 160}_1
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ -p_477 ∨ -b^{3, 160}_0
c  in DIMACS:
 6866  6867 -6868 -477 -6869 0
 6866  6867 -6868 -477  6870 0
 6866  6867 -6868 -477 -6871 0

c  2+1 --> break 
c    (-b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧  p_477) -> break
c  in CNF:
c     b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ -p_477 ∨ break
c  in DIMACS:
 6866 -6867  6868 -477 1162 0


c  2-1 --> 1
c    (-b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧ -p_477) -> (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0)
c  in CNF:
c     b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_2
c     b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_1
c     b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨  b^{3, 160}_0
c  in DIMACS:
 6866 -6867  6868  477 -6869 0
 6866 -6867  6868  477 -6870 0
 6866 -6867  6868  477  6871 0

c  1-1 --> 0
c    (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0 ∧ -p_477) -> (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧ -b^{3, 160}_0)
c  in CNF:
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_2
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_1
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_0
c  in DIMACS:
 6866  6867 -6868  477 -6869 0
 6866  6867 -6868  477 -6870 0
 6866  6867 -6868  477 -6871 0

c  0-1 --> -1
c    (-b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧ -p_477) -> ( b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0)
c  in CNF:
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨  b^{3, 160}_2
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_1
c     b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨  b^{3, 160}_0
c  in DIMACS:
 6866  6867  6868  477  6869 0
 6866  6867  6868  477 -6870 0
 6866  6867  6868  477  6871 0

c  -1-1 --> -2
c    ( b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧  b^{3, 159}_0 ∧ -p_477) -> ( b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0)
c  in CNF:
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨  b^{3, 160}_2
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨  b^{3, 160}_1
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨  p_477 ∨ -b^{3, 160}_0
c  in DIMACS:
-6866  6867 -6868  477  6869 0
-6866  6867 -6868  477  6870 0
-6866  6867 -6868  477 -6871 0

c  -2-1 --> break 
c    ( b^{3, 159}_2 ∧  b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧ -p_477) -> break
c  in CNF:
c    -b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨  b^{3, 159}_0 ∨  p_477 ∨ break
c  in DIMACS:
-6866 -6867  6868  477 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 159}_2 ∧ -b^{3, 159}_1 ∧ -b^{3, 159}_0 ∧ true) 
c  in CNF:
c    -b^{3, 159}_2 ∨  b^{3, 159}_1 ∨  b^{3, 159}_0 ∨ false 
c  in DIMACS:
-6866  6867  6868  0

c  3 does not represent an automaton state.
c    -(-b^{3, 159}_2 ∧  b^{3, 159}_1 ∧  b^{3, 159}_0 ∧ true) 
c  in CNF:
c     b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ false 
c  in DIMACS:
 6866 -6867 -6868  0
c  -3 does not represent an automaton state.
c    -( b^{3, 159}_2 ∧  b^{3, 159}_1 ∧  b^{3, 159}_0 ∧ true) 
c  in CNF:
c    -b^{3, 159}_2 ∨ -b^{3, 159}_1 ∨ -b^{3, 159}_0 ∨ false 
c  in DIMACS:
-6866 -6867 -6868  0

c i = 160
c  -2+1 --> -1
c    ( b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧  p_480) -> ( b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0)
c  in CNF:
c    -b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨  b^{3, 161}_2
c    -b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_1
c    -b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨  b^{3, 161}_0
c  in DIMACS:
-6869 -6870  6871 -480  6872 0
-6869 -6870  6871 -480 -6873 0
-6869 -6870  6871 -480  6874 0

c  -1+1 --> 0
c    ( b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0 ∧  p_480) -> (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧ -b^{3, 161}_0)
c  in CNF:
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_2
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_1
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_0
c  in DIMACS:
-6869  6870 -6871 -480 -6872 0
-6869  6870 -6871 -480 -6873 0
-6869  6870 -6871 -480 -6874 0

c  0+1 --> 1
c    (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧  p_480) -> (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0)
c  in CNF:
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_2
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_1
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨  b^{3, 161}_0
c  in DIMACS:
 6869  6870  6871 -480 -6872 0
 6869  6870  6871 -480 -6873 0
 6869  6870  6871 -480  6874 0

c  1+1 --> 2
c    (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0 ∧  p_480) -> (-b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0)
c  in CNF:
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_2
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨  b^{3, 161}_1
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ -p_480 ∨ -b^{3, 161}_0
c  in DIMACS:
 6869  6870 -6871 -480 -6872 0
 6869  6870 -6871 -480  6873 0
 6869  6870 -6871 -480 -6874 0

c  2+1 --> break 
c    (-b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧  p_480) -> break
c  in CNF:
c     b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 6869 -6870  6871 -480 1162 0


c  2-1 --> 1
c    (-b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧ -p_480) -> (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0)
c  in CNF:
c     b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_2
c     b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_1
c     b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨  b^{3, 161}_0
c  in DIMACS:
 6869 -6870  6871  480 -6872 0
 6869 -6870  6871  480 -6873 0
 6869 -6870  6871  480  6874 0

c  1-1 --> 0
c    (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0 ∧ -p_480) -> (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧ -b^{3, 161}_0)
c  in CNF:
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_2
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_1
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_0
c  in DIMACS:
 6869  6870 -6871  480 -6872 0
 6869  6870 -6871  480 -6873 0
 6869  6870 -6871  480 -6874 0

c  0-1 --> -1
c    (-b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧ -p_480) -> ( b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0)
c  in CNF:
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨  b^{3, 161}_2
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_1
c     b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨  b^{3, 161}_0
c  in DIMACS:
 6869  6870  6871  480  6872 0
 6869  6870  6871  480 -6873 0
 6869  6870  6871  480  6874 0

c  -1-1 --> -2
c    ( b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧  b^{3, 160}_0 ∧ -p_480) -> ( b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0)
c  in CNF:
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨  b^{3, 161}_2
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨  b^{3, 161}_1
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨  p_480 ∨ -b^{3, 161}_0
c  in DIMACS:
-6869  6870 -6871  480  6872 0
-6869  6870 -6871  480  6873 0
-6869  6870 -6871  480 -6874 0

c  -2-1 --> break 
c    ( b^{3, 160}_2 ∧  b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨  b^{3, 160}_0 ∨  p_480 ∨ break
c  in DIMACS:
-6869 -6870  6871  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 160}_2 ∧ -b^{3, 160}_1 ∧ -b^{3, 160}_0 ∧ true) 
c  in CNF:
c    -b^{3, 160}_2 ∨  b^{3, 160}_1 ∨  b^{3, 160}_0 ∨ false 
c  in DIMACS:
-6869  6870  6871  0

c  3 does not represent an automaton state.
c    -(-b^{3, 160}_2 ∧  b^{3, 160}_1 ∧  b^{3, 160}_0 ∧ true) 
c  in CNF:
c     b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ false 
c  in DIMACS:
 6869 -6870 -6871  0
c  -3 does not represent an automaton state.
c    -( b^{3, 160}_2 ∧  b^{3, 160}_1 ∧  b^{3, 160}_0 ∧ true) 
c  in CNF:
c    -b^{3, 160}_2 ∨ -b^{3, 160}_1 ∨ -b^{3, 160}_0 ∨ false 
c  in DIMACS:
-6869 -6870 -6871  0

c i = 161
c  -2+1 --> -1
c    ( b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧  p_483) -> ( b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0)
c  in CNF:
c    -b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨  b^{3, 162}_2
c    -b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_1
c    -b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨  b^{3, 162}_0
c  in DIMACS:
-6872 -6873  6874 -483  6875 0
-6872 -6873  6874 -483 -6876 0
-6872 -6873  6874 -483  6877 0

c  -1+1 --> 0
c    ( b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0 ∧  p_483) -> (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧ -b^{3, 162}_0)
c  in CNF:
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_2
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_1
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_0
c  in DIMACS:
-6872  6873 -6874 -483 -6875 0
-6872  6873 -6874 -483 -6876 0
-6872  6873 -6874 -483 -6877 0

c  0+1 --> 1
c    (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧  p_483) -> (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0)
c  in CNF:
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_2
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_1
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨  b^{3, 162}_0
c  in DIMACS:
 6872  6873  6874 -483 -6875 0
 6872  6873  6874 -483 -6876 0
 6872  6873  6874 -483  6877 0

c  1+1 --> 2
c    (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0 ∧  p_483) -> (-b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0)
c  in CNF:
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_2
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨  b^{3, 162}_1
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ -p_483 ∨ -b^{3, 162}_0
c  in DIMACS:
 6872  6873 -6874 -483 -6875 0
 6872  6873 -6874 -483  6876 0
 6872  6873 -6874 -483 -6877 0

c  2+1 --> break 
c    (-b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧  p_483) -> break
c  in CNF:
c     b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 6872 -6873  6874 -483 1162 0


c  2-1 --> 1
c    (-b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧ -p_483) -> (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0)
c  in CNF:
c     b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_2
c     b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_1
c     b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨  b^{3, 162}_0
c  in DIMACS:
 6872 -6873  6874  483 -6875 0
 6872 -6873  6874  483 -6876 0
 6872 -6873  6874  483  6877 0

c  1-1 --> 0
c    (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0 ∧ -p_483) -> (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧ -b^{3, 162}_0)
c  in CNF:
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_2
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_1
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_0
c  in DIMACS:
 6872  6873 -6874  483 -6875 0
 6872  6873 -6874  483 -6876 0
 6872  6873 -6874  483 -6877 0

c  0-1 --> -1
c    (-b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧ -p_483) -> ( b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0)
c  in CNF:
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨  b^{3, 162}_2
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_1
c     b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨  b^{3, 162}_0
c  in DIMACS:
 6872  6873  6874  483  6875 0
 6872  6873  6874  483 -6876 0
 6872  6873  6874  483  6877 0

c  -1-1 --> -2
c    ( b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧  b^{3, 161}_0 ∧ -p_483) -> ( b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0)
c  in CNF:
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨  b^{3, 162}_2
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨  b^{3, 162}_1
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨  p_483 ∨ -b^{3, 162}_0
c  in DIMACS:
-6872  6873 -6874  483  6875 0
-6872  6873 -6874  483  6876 0
-6872  6873 -6874  483 -6877 0

c  -2-1 --> break 
c    ( b^{3, 161}_2 ∧  b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨  b^{3, 161}_0 ∨  p_483 ∨ break
c  in DIMACS:
-6872 -6873  6874  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 161}_2 ∧ -b^{3, 161}_1 ∧ -b^{3, 161}_0 ∧ true) 
c  in CNF:
c    -b^{3, 161}_2 ∨  b^{3, 161}_1 ∨  b^{3, 161}_0 ∨ false 
c  in DIMACS:
-6872  6873  6874  0

c  3 does not represent an automaton state.
c    -(-b^{3, 161}_2 ∧  b^{3, 161}_1 ∧  b^{3, 161}_0 ∧ true) 
c  in CNF:
c     b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ false 
c  in DIMACS:
 6872 -6873 -6874  0
c  -3 does not represent an automaton state.
c    -( b^{3, 161}_2 ∧  b^{3, 161}_1 ∧  b^{3, 161}_0 ∧ true) 
c  in CNF:
c    -b^{3, 161}_2 ∨ -b^{3, 161}_1 ∨ -b^{3, 161}_0 ∨ false 
c  in DIMACS:
-6872 -6873 -6874  0

c i = 162
c  -2+1 --> -1
c    ( b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧  p_486) -> ( b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0)
c  in CNF:
c    -b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨  b^{3, 163}_2
c    -b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_1
c    -b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨  b^{3, 163}_0
c  in DIMACS:
-6875 -6876  6877 -486  6878 0
-6875 -6876  6877 -486 -6879 0
-6875 -6876  6877 -486  6880 0

c  -1+1 --> 0
c    ( b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0 ∧  p_486) -> (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧ -b^{3, 163}_0)
c  in CNF:
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_2
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_1
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_0
c  in DIMACS:
-6875  6876 -6877 -486 -6878 0
-6875  6876 -6877 -486 -6879 0
-6875  6876 -6877 -486 -6880 0

c  0+1 --> 1
c    (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧  p_486) -> (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0)
c  in CNF:
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_2
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_1
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨  b^{3, 163}_0
c  in DIMACS:
 6875  6876  6877 -486 -6878 0
 6875  6876  6877 -486 -6879 0
 6875  6876  6877 -486  6880 0

c  1+1 --> 2
c    (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0 ∧  p_486) -> (-b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0)
c  in CNF:
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_2
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨  b^{3, 163}_1
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ -p_486 ∨ -b^{3, 163}_0
c  in DIMACS:
 6875  6876 -6877 -486 -6878 0
 6875  6876 -6877 -486  6879 0
 6875  6876 -6877 -486 -6880 0

c  2+1 --> break 
c    (-b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧  p_486) -> break
c  in CNF:
c     b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 6875 -6876  6877 -486 1162 0


c  2-1 --> 1
c    (-b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧ -p_486) -> (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0)
c  in CNF:
c     b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_2
c     b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_1
c     b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨  b^{3, 163}_0
c  in DIMACS:
 6875 -6876  6877  486 -6878 0
 6875 -6876  6877  486 -6879 0
 6875 -6876  6877  486  6880 0

c  1-1 --> 0
c    (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0 ∧ -p_486) -> (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧ -b^{3, 163}_0)
c  in CNF:
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_2
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_1
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_0
c  in DIMACS:
 6875  6876 -6877  486 -6878 0
 6875  6876 -6877  486 -6879 0
 6875  6876 -6877  486 -6880 0

c  0-1 --> -1
c    (-b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧ -p_486) -> ( b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0)
c  in CNF:
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨  b^{3, 163}_2
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_1
c     b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨  b^{3, 163}_0
c  in DIMACS:
 6875  6876  6877  486  6878 0
 6875  6876  6877  486 -6879 0
 6875  6876  6877  486  6880 0

c  -1-1 --> -2
c    ( b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧  b^{3, 162}_0 ∧ -p_486) -> ( b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0)
c  in CNF:
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨  b^{3, 163}_2
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨  b^{3, 163}_1
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨  p_486 ∨ -b^{3, 163}_0
c  in DIMACS:
-6875  6876 -6877  486  6878 0
-6875  6876 -6877  486  6879 0
-6875  6876 -6877  486 -6880 0

c  -2-1 --> break 
c    ( b^{3, 162}_2 ∧  b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨  b^{3, 162}_0 ∨  p_486 ∨ break
c  in DIMACS:
-6875 -6876  6877  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 162}_2 ∧ -b^{3, 162}_1 ∧ -b^{3, 162}_0 ∧ true) 
c  in CNF:
c    -b^{3, 162}_2 ∨  b^{3, 162}_1 ∨  b^{3, 162}_0 ∨ false 
c  in DIMACS:
-6875  6876  6877  0

c  3 does not represent an automaton state.
c    -(-b^{3, 162}_2 ∧  b^{3, 162}_1 ∧  b^{3, 162}_0 ∧ true) 
c  in CNF:
c     b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ false 
c  in DIMACS:
 6875 -6876 -6877  0
c  -3 does not represent an automaton state.
c    -( b^{3, 162}_2 ∧  b^{3, 162}_1 ∧  b^{3, 162}_0 ∧ true) 
c  in CNF:
c    -b^{3, 162}_2 ∨ -b^{3, 162}_1 ∨ -b^{3, 162}_0 ∨ false 
c  in DIMACS:
-6875 -6876 -6877  0

c i = 163
c  -2+1 --> -1
c    ( b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧  p_489) -> ( b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0)
c  in CNF:
c    -b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨  b^{3, 164}_2
c    -b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_1
c    -b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨  b^{3, 164}_0
c  in DIMACS:
-6878 -6879  6880 -489  6881 0
-6878 -6879  6880 -489 -6882 0
-6878 -6879  6880 -489  6883 0

c  -1+1 --> 0
c    ( b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0 ∧  p_489) -> (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧ -b^{3, 164}_0)
c  in CNF:
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_2
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_1
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_0
c  in DIMACS:
-6878  6879 -6880 -489 -6881 0
-6878  6879 -6880 -489 -6882 0
-6878  6879 -6880 -489 -6883 0

c  0+1 --> 1
c    (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧  p_489) -> (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0)
c  in CNF:
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_2
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_1
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨  b^{3, 164}_0
c  in DIMACS:
 6878  6879  6880 -489 -6881 0
 6878  6879  6880 -489 -6882 0
 6878  6879  6880 -489  6883 0

c  1+1 --> 2
c    (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0 ∧  p_489) -> (-b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0)
c  in CNF:
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_2
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨  b^{3, 164}_1
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ -p_489 ∨ -b^{3, 164}_0
c  in DIMACS:
 6878  6879 -6880 -489 -6881 0
 6878  6879 -6880 -489  6882 0
 6878  6879 -6880 -489 -6883 0

c  2+1 --> break 
c    (-b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧  p_489) -> break
c  in CNF:
c     b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ -p_489 ∨ break
c  in DIMACS:
 6878 -6879  6880 -489 1162 0


c  2-1 --> 1
c    (-b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧ -p_489) -> (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0)
c  in CNF:
c     b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_2
c     b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_1
c     b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨  b^{3, 164}_0
c  in DIMACS:
 6878 -6879  6880  489 -6881 0
 6878 -6879  6880  489 -6882 0
 6878 -6879  6880  489  6883 0

c  1-1 --> 0
c    (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0 ∧ -p_489) -> (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧ -b^{3, 164}_0)
c  in CNF:
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_2
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_1
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_0
c  in DIMACS:
 6878  6879 -6880  489 -6881 0
 6878  6879 -6880  489 -6882 0
 6878  6879 -6880  489 -6883 0

c  0-1 --> -1
c    (-b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧ -p_489) -> ( b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0)
c  in CNF:
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨  b^{3, 164}_2
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_1
c     b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨  b^{3, 164}_0
c  in DIMACS:
 6878  6879  6880  489  6881 0
 6878  6879  6880  489 -6882 0
 6878  6879  6880  489  6883 0

c  -1-1 --> -2
c    ( b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧  b^{3, 163}_0 ∧ -p_489) -> ( b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0)
c  in CNF:
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨  b^{3, 164}_2
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨  b^{3, 164}_1
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨  p_489 ∨ -b^{3, 164}_0
c  in DIMACS:
-6878  6879 -6880  489  6881 0
-6878  6879 -6880  489  6882 0
-6878  6879 -6880  489 -6883 0

c  -2-1 --> break 
c    ( b^{3, 163}_2 ∧  b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧ -p_489) -> break
c  in CNF:
c    -b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨  b^{3, 163}_0 ∨  p_489 ∨ break
c  in DIMACS:
-6878 -6879  6880  489 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 163}_2 ∧ -b^{3, 163}_1 ∧ -b^{3, 163}_0 ∧ true) 
c  in CNF:
c    -b^{3, 163}_2 ∨  b^{3, 163}_1 ∨  b^{3, 163}_0 ∨ false 
c  in DIMACS:
-6878  6879  6880  0

c  3 does not represent an automaton state.
c    -(-b^{3, 163}_2 ∧  b^{3, 163}_1 ∧  b^{3, 163}_0 ∧ true) 
c  in CNF:
c     b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ false 
c  in DIMACS:
 6878 -6879 -6880  0
c  -3 does not represent an automaton state.
c    -( b^{3, 163}_2 ∧  b^{3, 163}_1 ∧  b^{3, 163}_0 ∧ true) 
c  in CNF:
c    -b^{3, 163}_2 ∨ -b^{3, 163}_1 ∨ -b^{3, 163}_0 ∨ false 
c  in DIMACS:
-6878 -6879 -6880  0

c i = 164
c  -2+1 --> -1
c    ( b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧  p_492) -> ( b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0)
c  in CNF:
c    -b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨  b^{3, 165}_2
c    -b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_1
c    -b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨  b^{3, 165}_0
c  in DIMACS:
-6881 -6882  6883 -492  6884 0
-6881 -6882  6883 -492 -6885 0
-6881 -6882  6883 -492  6886 0

c  -1+1 --> 0
c    ( b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0 ∧  p_492) -> (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧ -b^{3, 165}_0)
c  in CNF:
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_2
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_1
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_0
c  in DIMACS:
-6881  6882 -6883 -492 -6884 0
-6881  6882 -6883 -492 -6885 0
-6881  6882 -6883 -492 -6886 0

c  0+1 --> 1
c    (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧  p_492) -> (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0)
c  in CNF:
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_2
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_1
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨  b^{3, 165}_0
c  in DIMACS:
 6881  6882  6883 -492 -6884 0
 6881  6882  6883 -492 -6885 0
 6881  6882  6883 -492  6886 0

c  1+1 --> 2
c    (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0 ∧  p_492) -> (-b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0)
c  in CNF:
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_2
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨  b^{3, 165}_1
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ -p_492 ∨ -b^{3, 165}_0
c  in DIMACS:
 6881  6882 -6883 -492 -6884 0
 6881  6882 -6883 -492  6885 0
 6881  6882 -6883 -492 -6886 0

c  2+1 --> break 
c    (-b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧  p_492) -> break
c  in CNF:
c     b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 6881 -6882  6883 -492 1162 0


c  2-1 --> 1
c    (-b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧ -p_492) -> (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0)
c  in CNF:
c     b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_2
c     b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_1
c     b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨  b^{3, 165}_0
c  in DIMACS:
 6881 -6882  6883  492 -6884 0
 6881 -6882  6883  492 -6885 0
 6881 -6882  6883  492  6886 0

c  1-1 --> 0
c    (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0 ∧ -p_492) -> (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧ -b^{3, 165}_0)
c  in CNF:
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_2
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_1
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_0
c  in DIMACS:
 6881  6882 -6883  492 -6884 0
 6881  6882 -6883  492 -6885 0
 6881  6882 -6883  492 -6886 0

c  0-1 --> -1
c    (-b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧ -p_492) -> ( b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0)
c  in CNF:
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨  b^{3, 165}_2
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_1
c     b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨  b^{3, 165}_0
c  in DIMACS:
 6881  6882  6883  492  6884 0
 6881  6882  6883  492 -6885 0
 6881  6882  6883  492  6886 0

c  -1-1 --> -2
c    ( b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧  b^{3, 164}_0 ∧ -p_492) -> ( b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0)
c  in CNF:
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨  b^{3, 165}_2
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨  b^{3, 165}_1
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨  p_492 ∨ -b^{3, 165}_0
c  in DIMACS:
-6881  6882 -6883  492  6884 0
-6881  6882 -6883  492  6885 0
-6881  6882 -6883  492 -6886 0

c  -2-1 --> break 
c    ( b^{3, 164}_2 ∧  b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨  b^{3, 164}_0 ∨  p_492 ∨ break
c  in DIMACS:
-6881 -6882  6883  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 164}_2 ∧ -b^{3, 164}_1 ∧ -b^{3, 164}_0 ∧ true) 
c  in CNF:
c    -b^{3, 164}_2 ∨  b^{3, 164}_1 ∨  b^{3, 164}_0 ∨ false 
c  in DIMACS:
-6881  6882  6883  0

c  3 does not represent an automaton state.
c    -(-b^{3, 164}_2 ∧  b^{3, 164}_1 ∧  b^{3, 164}_0 ∧ true) 
c  in CNF:
c     b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ false 
c  in DIMACS:
 6881 -6882 -6883  0
c  -3 does not represent an automaton state.
c    -( b^{3, 164}_2 ∧  b^{3, 164}_1 ∧  b^{3, 164}_0 ∧ true) 
c  in CNF:
c    -b^{3, 164}_2 ∨ -b^{3, 164}_1 ∨ -b^{3, 164}_0 ∨ false 
c  in DIMACS:
-6881 -6882 -6883  0

c i = 165
c  -2+1 --> -1
c    ( b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧  p_495) -> ( b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0)
c  in CNF:
c    -b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨  b^{3, 166}_2
c    -b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_1
c    -b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨  b^{3, 166}_0
c  in DIMACS:
-6884 -6885  6886 -495  6887 0
-6884 -6885  6886 -495 -6888 0
-6884 -6885  6886 -495  6889 0

c  -1+1 --> 0
c    ( b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0 ∧  p_495) -> (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧ -b^{3, 166}_0)
c  in CNF:
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_2
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_1
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_0
c  in DIMACS:
-6884  6885 -6886 -495 -6887 0
-6884  6885 -6886 -495 -6888 0
-6884  6885 -6886 -495 -6889 0

c  0+1 --> 1
c    (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧  p_495) -> (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0)
c  in CNF:
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_2
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_1
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨  b^{3, 166}_0
c  in DIMACS:
 6884  6885  6886 -495 -6887 0
 6884  6885  6886 -495 -6888 0
 6884  6885  6886 -495  6889 0

c  1+1 --> 2
c    (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0 ∧  p_495) -> (-b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0)
c  in CNF:
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_2
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨  b^{3, 166}_1
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ -p_495 ∨ -b^{3, 166}_0
c  in DIMACS:
 6884  6885 -6886 -495 -6887 0
 6884  6885 -6886 -495  6888 0
 6884  6885 -6886 -495 -6889 0

c  2+1 --> break 
c    (-b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧  p_495) -> break
c  in CNF:
c     b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 6884 -6885  6886 -495 1162 0


c  2-1 --> 1
c    (-b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧ -p_495) -> (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0)
c  in CNF:
c     b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_2
c     b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_1
c     b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨  b^{3, 166}_0
c  in DIMACS:
 6884 -6885  6886  495 -6887 0
 6884 -6885  6886  495 -6888 0
 6884 -6885  6886  495  6889 0

c  1-1 --> 0
c    (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0 ∧ -p_495) -> (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧ -b^{3, 166}_0)
c  in CNF:
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_2
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_1
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_0
c  in DIMACS:
 6884  6885 -6886  495 -6887 0
 6884  6885 -6886  495 -6888 0
 6884  6885 -6886  495 -6889 0

c  0-1 --> -1
c    (-b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧ -p_495) -> ( b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0)
c  in CNF:
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨  b^{3, 166}_2
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_1
c     b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨  b^{3, 166}_0
c  in DIMACS:
 6884  6885  6886  495  6887 0
 6884  6885  6886  495 -6888 0
 6884  6885  6886  495  6889 0

c  -1-1 --> -2
c    ( b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧  b^{3, 165}_0 ∧ -p_495) -> ( b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0)
c  in CNF:
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨  b^{3, 166}_2
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨  b^{3, 166}_1
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨  p_495 ∨ -b^{3, 166}_0
c  in DIMACS:
-6884  6885 -6886  495  6887 0
-6884  6885 -6886  495  6888 0
-6884  6885 -6886  495 -6889 0

c  -2-1 --> break 
c    ( b^{3, 165}_2 ∧  b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨  b^{3, 165}_0 ∨  p_495 ∨ break
c  in DIMACS:
-6884 -6885  6886  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 165}_2 ∧ -b^{3, 165}_1 ∧ -b^{3, 165}_0 ∧ true) 
c  in CNF:
c    -b^{3, 165}_2 ∨  b^{3, 165}_1 ∨  b^{3, 165}_0 ∨ false 
c  in DIMACS:
-6884  6885  6886  0

c  3 does not represent an automaton state.
c    -(-b^{3, 165}_2 ∧  b^{3, 165}_1 ∧  b^{3, 165}_0 ∧ true) 
c  in CNF:
c     b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ false 
c  in DIMACS:
 6884 -6885 -6886  0
c  -3 does not represent an automaton state.
c    -( b^{3, 165}_2 ∧  b^{3, 165}_1 ∧  b^{3, 165}_0 ∧ true) 
c  in CNF:
c    -b^{3, 165}_2 ∨ -b^{3, 165}_1 ∨ -b^{3, 165}_0 ∨ false 
c  in DIMACS:
-6884 -6885 -6886  0

c i = 166
c  -2+1 --> -1
c    ( b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧  p_498) -> ( b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0)
c  in CNF:
c    -b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨  b^{3, 167}_2
c    -b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_1
c    -b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨  b^{3, 167}_0
c  in DIMACS:
-6887 -6888  6889 -498  6890 0
-6887 -6888  6889 -498 -6891 0
-6887 -6888  6889 -498  6892 0

c  -1+1 --> 0
c    ( b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0 ∧  p_498) -> (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧ -b^{3, 167}_0)
c  in CNF:
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_2
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_1
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_0
c  in DIMACS:
-6887  6888 -6889 -498 -6890 0
-6887  6888 -6889 -498 -6891 0
-6887  6888 -6889 -498 -6892 0

c  0+1 --> 1
c    (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧  p_498) -> (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0)
c  in CNF:
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_2
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_1
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨  b^{3, 167}_0
c  in DIMACS:
 6887  6888  6889 -498 -6890 0
 6887  6888  6889 -498 -6891 0
 6887  6888  6889 -498  6892 0

c  1+1 --> 2
c    (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0 ∧  p_498) -> (-b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0)
c  in CNF:
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_2
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨  b^{3, 167}_1
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ -p_498 ∨ -b^{3, 167}_0
c  in DIMACS:
 6887  6888 -6889 -498 -6890 0
 6887  6888 -6889 -498  6891 0
 6887  6888 -6889 -498 -6892 0

c  2+1 --> break 
c    (-b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧  p_498) -> break
c  in CNF:
c     b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 6887 -6888  6889 -498 1162 0


c  2-1 --> 1
c    (-b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧ -p_498) -> (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0)
c  in CNF:
c     b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_2
c     b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_1
c     b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨  b^{3, 167}_0
c  in DIMACS:
 6887 -6888  6889  498 -6890 0
 6887 -6888  6889  498 -6891 0
 6887 -6888  6889  498  6892 0

c  1-1 --> 0
c    (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0 ∧ -p_498) -> (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧ -b^{3, 167}_0)
c  in CNF:
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_2
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_1
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_0
c  in DIMACS:
 6887  6888 -6889  498 -6890 0
 6887  6888 -6889  498 -6891 0
 6887  6888 -6889  498 -6892 0

c  0-1 --> -1
c    (-b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧ -p_498) -> ( b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0)
c  in CNF:
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨  b^{3, 167}_2
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_1
c     b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨  b^{3, 167}_0
c  in DIMACS:
 6887  6888  6889  498  6890 0
 6887  6888  6889  498 -6891 0
 6887  6888  6889  498  6892 0

c  -1-1 --> -2
c    ( b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧  b^{3, 166}_0 ∧ -p_498) -> ( b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0)
c  in CNF:
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨  b^{3, 167}_2
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨  b^{3, 167}_1
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨  p_498 ∨ -b^{3, 167}_0
c  in DIMACS:
-6887  6888 -6889  498  6890 0
-6887  6888 -6889  498  6891 0
-6887  6888 -6889  498 -6892 0

c  -2-1 --> break 
c    ( b^{3, 166}_2 ∧  b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨  b^{3, 166}_0 ∨  p_498 ∨ break
c  in DIMACS:
-6887 -6888  6889  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 166}_2 ∧ -b^{3, 166}_1 ∧ -b^{3, 166}_0 ∧ true) 
c  in CNF:
c    -b^{3, 166}_2 ∨  b^{3, 166}_1 ∨  b^{3, 166}_0 ∨ false 
c  in DIMACS:
-6887  6888  6889  0

c  3 does not represent an automaton state.
c    -(-b^{3, 166}_2 ∧  b^{3, 166}_1 ∧  b^{3, 166}_0 ∧ true) 
c  in CNF:
c     b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ false 
c  in DIMACS:
 6887 -6888 -6889  0
c  -3 does not represent an automaton state.
c    -( b^{3, 166}_2 ∧  b^{3, 166}_1 ∧  b^{3, 166}_0 ∧ true) 
c  in CNF:
c    -b^{3, 166}_2 ∨ -b^{3, 166}_1 ∨ -b^{3, 166}_0 ∨ false 
c  in DIMACS:
-6887 -6888 -6889  0

c i = 167
c  -2+1 --> -1
c    ( b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧  p_501) -> ( b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0)
c  in CNF:
c    -b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨  b^{3, 168}_2
c    -b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_1
c    -b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨  b^{3, 168}_0
c  in DIMACS:
-6890 -6891  6892 -501  6893 0
-6890 -6891  6892 -501 -6894 0
-6890 -6891  6892 -501  6895 0

c  -1+1 --> 0
c    ( b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0 ∧  p_501) -> (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧ -b^{3, 168}_0)
c  in CNF:
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_2
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_1
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_0
c  in DIMACS:
-6890  6891 -6892 -501 -6893 0
-6890  6891 -6892 -501 -6894 0
-6890  6891 -6892 -501 -6895 0

c  0+1 --> 1
c    (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧  p_501) -> (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0)
c  in CNF:
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_2
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_1
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨  b^{3, 168}_0
c  in DIMACS:
 6890  6891  6892 -501 -6893 0
 6890  6891  6892 -501 -6894 0
 6890  6891  6892 -501  6895 0

c  1+1 --> 2
c    (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0 ∧  p_501) -> (-b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0)
c  in CNF:
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_2
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨  b^{3, 168}_1
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ -p_501 ∨ -b^{3, 168}_0
c  in DIMACS:
 6890  6891 -6892 -501 -6893 0
 6890  6891 -6892 -501  6894 0
 6890  6891 -6892 -501 -6895 0

c  2+1 --> break 
c    (-b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧  p_501) -> break
c  in CNF:
c     b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ -p_501 ∨ break
c  in DIMACS:
 6890 -6891  6892 -501 1162 0


c  2-1 --> 1
c    (-b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧ -p_501) -> (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0)
c  in CNF:
c     b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_2
c     b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_1
c     b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨  b^{3, 168}_0
c  in DIMACS:
 6890 -6891  6892  501 -6893 0
 6890 -6891  6892  501 -6894 0
 6890 -6891  6892  501  6895 0

c  1-1 --> 0
c    (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0 ∧ -p_501) -> (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧ -b^{3, 168}_0)
c  in CNF:
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_2
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_1
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_0
c  in DIMACS:
 6890  6891 -6892  501 -6893 0
 6890  6891 -6892  501 -6894 0
 6890  6891 -6892  501 -6895 0

c  0-1 --> -1
c    (-b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧ -p_501) -> ( b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0)
c  in CNF:
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨  b^{3, 168}_2
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_1
c     b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨  b^{3, 168}_0
c  in DIMACS:
 6890  6891  6892  501  6893 0
 6890  6891  6892  501 -6894 0
 6890  6891  6892  501  6895 0

c  -1-1 --> -2
c    ( b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧  b^{3, 167}_0 ∧ -p_501) -> ( b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0)
c  in CNF:
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨  b^{3, 168}_2
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨  b^{3, 168}_1
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨  p_501 ∨ -b^{3, 168}_0
c  in DIMACS:
-6890  6891 -6892  501  6893 0
-6890  6891 -6892  501  6894 0
-6890  6891 -6892  501 -6895 0

c  -2-1 --> break 
c    ( b^{3, 167}_2 ∧  b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧ -p_501) -> break
c  in CNF:
c    -b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨  b^{3, 167}_0 ∨  p_501 ∨ break
c  in DIMACS:
-6890 -6891  6892  501 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 167}_2 ∧ -b^{3, 167}_1 ∧ -b^{3, 167}_0 ∧ true) 
c  in CNF:
c    -b^{3, 167}_2 ∨  b^{3, 167}_1 ∨  b^{3, 167}_0 ∨ false 
c  in DIMACS:
-6890  6891  6892  0

c  3 does not represent an automaton state.
c    -(-b^{3, 167}_2 ∧  b^{3, 167}_1 ∧  b^{3, 167}_0 ∧ true) 
c  in CNF:
c     b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ false 
c  in DIMACS:
 6890 -6891 -6892  0
c  -3 does not represent an automaton state.
c    -( b^{3, 167}_2 ∧  b^{3, 167}_1 ∧  b^{3, 167}_0 ∧ true) 
c  in CNF:
c    -b^{3, 167}_2 ∨ -b^{3, 167}_1 ∨ -b^{3, 167}_0 ∨ false 
c  in DIMACS:
-6890 -6891 -6892  0

c i = 168
c  -2+1 --> -1
c    ( b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧  p_504) -> ( b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0)
c  in CNF:
c    -b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨  b^{3, 169}_2
c    -b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_1
c    -b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨  b^{3, 169}_0
c  in DIMACS:
-6893 -6894  6895 -504  6896 0
-6893 -6894  6895 -504 -6897 0
-6893 -6894  6895 -504  6898 0

c  -1+1 --> 0
c    ( b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0 ∧  p_504) -> (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧ -b^{3, 169}_0)
c  in CNF:
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_2
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_1
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_0
c  in DIMACS:
-6893  6894 -6895 -504 -6896 0
-6893  6894 -6895 -504 -6897 0
-6893  6894 -6895 -504 -6898 0

c  0+1 --> 1
c    (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧  p_504) -> (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0)
c  in CNF:
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_2
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_1
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨  b^{3, 169}_0
c  in DIMACS:
 6893  6894  6895 -504 -6896 0
 6893  6894  6895 -504 -6897 0
 6893  6894  6895 -504  6898 0

c  1+1 --> 2
c    (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0 ∧  p_504) -> (-b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0)
c  in CNF:
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_2
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨  b^{3, 169}_1
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ -p_504 ∨ -b^{3, 169}_0
c  in DIMACS:
 6893  6894 -6895 -504 -6896 0
 6893  6894 -6895 -504  6897 0
 6893  6894 -6895 -504 -6898 0

c  2+1 --> break 
c    (-b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧  p_504) -> break
c  in CNF:
c     b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 6893 -6894  6895 -504 1162 0


c  2-1 --> 1
c    (-b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧ -p_504) -> (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0)
c  in CNF:
c     b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_2
c     b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_1
c     b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨  b^{3, 169}_0
c  in DIMACS:
 6893 -6894  6895  504 -6896 0
 6893 -6894  6895  504 -6897 0
 6893 -6894  6895  504  6898 0

c  1-1 --> 0
c    (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0 ∧ -p_504) -> (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧ -b^{3, 169}_0)
c  in CNF:
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_2
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_1
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_0
c  in DIMACS:
 6893  6894 -6895  504 -6896 0
 6893  6894 -6895  504 -6897 0
 6893  6894 -6895  504 -6898 0

c  0-1 --> -1
c    (-b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧ -p_504) -> ( b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0)
c  in CNF:
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨  b^{3, 169}_2
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_1
c     b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨  b^{3, 169}_0
c  in DIMACS:
 6893  6894  6895  504  6896 0
 6893  6894  6895  504 -6897 0
 6893  6894  6895  504  6898 0

c  -1-1 --> -2
c    ( b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧  b^{3, 168}_0 ∧ -p_504) -> ( b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0)
c  in CNF:
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨  b^{3, 169}_2
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨  b^{3, 169}_1
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨  p_504 ∨ -b^{3, 169}_0
c  in DIMACS:
-6893  6894 -6895  504  6896 0
-6893  6894 -6895  504  6897 0
-6893  6894 -6895  504 -6898 0

c  -2-1 --> break 
c    ( b^{3, 168}_2 ∧  b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨  b^{3, 168}_0 ∨  p_504 ∨ break
c  in DIMACS:
-6893 -6894  6895  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 168}_2 ∧ -b^{3, 168}_1 ∧ -b^{3, 168}_0 ∧ true) 
c  in CNF:
c    -b^{3, 168}_2 ∨  b^{3, 168}_1 ∨  b^{3, 168}_0 ∨ false 
c  in DIMACS:
-6893  6894  6895  0

c  3 does not represent an automaton state.
c    -(-b^{3, 168}_2 ∧  b^{3, 168}_1 ∧  b^{3, 168}_0 ∧ true) 
c  in CNF:
c     b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ false 
c  in DIMACS:
 6893 -6894 -6895  0
c  -3 does not represent an automaton state.
c    -( b^{3, 168}_2 ∧  b^{3, 168}_1 ∧  b^{3, 168}_0 ∧ true) 
c  in CNF:
c    -b^{3, 168}_2 ∨ -b^{3, 168}_1 ∨ -b^{3, 168}_0 ∨ false 
c  in DIMACS:
-6893 -6894 -6895  0

c i = 169
c  -2+1 --> -1
c    ( b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧  p_507) -> ( b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0)
c  in CNF:
c    -b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨  b^{3, 170}_2
c    -b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_1
c    -b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨  b^{3, 170}_0
c  in DIMACS:
-6896 -6897  6898 -507  6899 0
-6896 -6897  6898 -507 -6900 0
-6896 -6897  6898 -507  6901 0

c  -1+1 --> 0
c    ( b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0 ∧  p_507) -> (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧ -b^{3, 170}_0)
c  in CNF:
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_2
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_1
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_0
c  in DIMACS:
-6896  6897 -6898 -507 -6899 0
-6896  6897 -6898 -507 -6900 0
-6896  6897 -6898 -507 -6901 0

c  0+1 --> 1
c    (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧  p_507) -> (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0)
c  in CNF:
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_2
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_1
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨  b^{3, 170}_0
c  in DIMACS:
 6896  6897  6898 -507 -6899 0
 6896  6897  6898 -507 -6900 0
 6896  6897  6898 -507  6901 0

c  1+1 --> 2
c    (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0 ∧  p_507) -> (-b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0)
c  in CNF:
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_2
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨  b^{3, 170}_1
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ -p_507 ∨ -b^{3, 170}_0
c  in DIMACS:
 6896  6897 -6898 -507 -6899 0
 6896  6897 -6898 -507  6900 0
 6896  6897 -6898 -507 -6901 0

c  2+1 --> break 
c    (-b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧  p_507) -> break
c  in CNF:
c     b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ -p_507 ∨ break
c  in DIMACS:
 6896 -6897  6898 -507 1162 0


c  2-1 --> 1
c    (-b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧ -p_507) -> (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0)
c  in CNF:
c     b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_2
c     b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_1
c     b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨  b^{3, 170}_0
c  in DIMACS:
 6896 -6897  6898  507 -6899 0
 6896 -6897  6898  507 -6900 0
 6896 -6897  6898  507  6901 0

c  1-1 --> 0
c    (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0 ∧ -p_507) -> (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧ -b^{3, 170}_0)
c  in CNF:
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_2
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_1
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_0
c  in DIMACS:
 6896  6897 -6898  507 -6899 0
 6896  6897 -6898  507 -6900 0
 6896  6897 -6898  507 -6901 0

c  0-1 --> -1
c    (-b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧ -p_507) -> ( b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0)
c  in CNF:
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨  b^{3, 170}_2
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_1
c     b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨  b^{3, 170}_0
c  in DIMACS:
 6896  6897  6898  507  6899 0
 6896  6897  6898  507 -6900 0
 6896  6897  6898  507  6901 0

c  -1-1 --> -2
c    ( b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧  b^{3, 169}_0 ∧ -p_507) -> ( b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0)
c  in CNF:
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨  b^{3, 170}_2
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨  b^{3, 170}_1
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨  p_507 ∨ -b^{3, 170}_0
c  in DIMACS:
-6896  6897 -6898  507  6899 0
-6896  6897 -6898  507  6900 0
-6896  6897 -6898  507 -6901 0

c  -2-1 --> break 
c    ( b^{3, 169}_2 ∧  b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧ -p_507) -> break
c  in CNF:
c    -b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨  b^{3, 169}_0 ∨  p_507 ∨ break
c  in DIMACS:
-6896 -6897  6898  507 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 169}_2 ∧ -b^{3, 169}_1 ∧ -b^{3, 169}_0 ∧ true) 
c  in CNF:
c    -b^{3, 169}_2 ∨  b^{3, 169}_1 ∨  b^{3, 169}_0 ∨ false 
c  in DIMACS:
-6896  6897  6898  0

c  3 does not represent an automaton state.
c    -(-b^{3, 169}_2 ∧  b^{3, 169}_1 ∧  b^{3, 169}_0 ∧ true) 
c  in CNF:
c     b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ false 
c  in DIMACS:
 6896 -6897 -6898  0
c  -3 does not represent an automaton state.
c    -( b^{3, 169}_2 ∧  b^{3, 169}_1 ∧  b^{3, 169}_0 ∧ true) 
c  in CNF:
c    -b^{3, 169}_2 ∨ -b^{3, 169}_1 ∨ -b^{3, 169}_0 ∨ false 
c  in DIMACS:
-6896 -6897 -6898  0

c i = 170
c  -2+1 --> -1
c    ( b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧  p_510) -> ( b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0)
c  in CNF:
c    -b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨  b^{3, 171}_2
c    -b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_1
c    -b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨  b^{3, 171}_0
c  in DIMACS:
-6899 -6900  6901 -510  6902 0
-6899 -6900  6901 -510 -6903 0
-6899 -6900  6901 -510  6904 0

c  -1+1 --> 0
c    ( b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0 ∧  p_510) -> (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧ -b^{3, 171}_0)
c  in CNF:
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_2
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_1
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_0
c  in DIMACS:
-6899  6900 -6901 -510 -6902 0
-6899  6900 -6901 -510 -6903 0
-6899  6900 -6901 -510 -6904 0

c  0+1 --> 1
c    (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧  p_510) -> (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0)
c  in CNF:
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_2
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_1
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨  b^{3, 171}_0
c  in DIMACS:
 6899  6900  6901 -510 -6902 0
 6899  6900  6901 -510 -6903 0
 6899  6900  6901 -510  6904 0

c  1+1 --> 2
c    (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0 ∧  p_510) -> (-b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0)
c  in CNF:
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_2
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨  b^{3, 171}_1
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ -p_510 ∨ -b^{3, 171}_0
c  in DIMACS:
 6899  6900 -6901 -510 -6902 0
 6899  6900 -6901 -510  6903 0
 6899  6900 -6901 -510 -6904 0

c  2+1 --> break 
c    (-b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧  p_510) -> break
c  in CNF:
c     b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 6899 -6900  6901 -510 1162 0


c  2-1 --> 1
c    (-b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧ -p_510) -> (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0)
c  in CNF:
c     b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_2
c     b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_1
c     b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨  b^{3, 171}_0
c  in DIMACS:
 6899 -6900  6901  510 -6902 0
 6899 -6900  6901  510 -6903 0
 6899 -6900  6901  510  6904 0

c  1-1 --> 0
c    (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0 ∧ -p_510) -> (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧ -b^{3, 171}_0)
c  in CNF:
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_2
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_1
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_0
c  in DIMACS:
 6899  6900 -6901  510 -6902 0
 6899  6900 -6901  510 -6903 0
 6899  6900 -6901  510 -6904 0

c  0-1 --> -1
c    (-b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧ -p_510) -> ( b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0)
c  in CNF:
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨  b^{3, 171}_2
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_1
c     b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨  b^{3, 171}_0
c  in DIMACS:
 6899  6900  6901  510  6902 0
 6899  6900  6901  510 -6903 0
 6899  6900  6901  510  6904 0

c  -1-1 --> -2
c    ( b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧  b^{3, 170}_0 ∧ -p_510) -> ( b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0)
c  in CNF:
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨  b^{3, 171}_2
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨  b^{3, 171}_1
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨  p_510 ∨ -b^{3, 171}_0
c  in DIMACS:
-6899  6900 -6901  510  6902 0
-6899  6900 -6901  510  6903 0
-6899  6900 -6901  510 -6904 0

c  -2-1 --> break 
c    ( b^{3, 170}_2 ∧  b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨  b^{3, 170}_0 ∨  p_510 ∨ break
c  in DIMACS:
-6899 -6900  6901  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 170}_2 ∧ -b^{3, 170}_1 ∧ -b^{3, 170}_0 ∧ true) 
c  in CNF:
c    -b^{3, 170}_2 ∨  b^{3, 170}_1 ∨  b^{3, 170}_0 ∨ false 
c  in DIMACS:
-6899  6900  6901  0

c  3 does not represent an automaton state.
c    -(-b^{3, 170}_2 ∧  b^{3, 170}_1 ∧  b^{3, 170}_0 ∧ true) 
c  in CNF:
c     b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ false 
c  in DIMACS:
 6899 -6900 -6901  0
c  -3 does not represent an automaton state.
c    -( b^{3, 170}_2 ∧  b^{3, 170}_1 ∧  b^{3, 170}_0 ∧ true) 
c  in CNF:
c    -b^{3, 170}_2 ∨ -b^{3, 170}_1 ∨ -b^{3, 170}_0 ∨ false 
c  in DIMACS:
-6899 -6900 -6901  0

c i = 171
c  -2+1 --> -1
c    ( b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧  p_513) -> ( b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0)
c  in CNF:
c    -b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨  b^{3, 172}_2
c    -b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_1
c    -b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨  b^{3, 172}_0
c  in DIMACS:
-6902 -6903  6904 -513  6905 0
-6902 -6903  6904 -513 -6906 0
-6902 -6903  6904 -513  6907 0

c  -1+1 --> 0
c    ( b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0 ∧  p_513) -> (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧ -b^{3, 172}_0)
c  in CNF:
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_2
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_1
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_0
c  in DIMACS:
-6902  6903 -6904 -513 -6905 0
-6902  6903 -6904 -513 -6906 0
-6902  6903 -6904 -513 -6907 0

c  0+1 --> 1
c    (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧  p_513) -> (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0)
c  in CNF:
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_2
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_1
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨  b^{3, 172}_0
c  in DIMACS:
 6902  6903  6904 -513 -6905 0
 6902  6903  6904 -513 -6906 0
 6902  6903  6904 -513  6907 0

c  1+1 --> 2
c    (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0 ∧  p_513) -> (-b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0)
c  in CNF:
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_2
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨  b^{3, 172}_1
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ -p_513 ∨ -b^{3, 172}_0
c  in DIMACS:
 6902  6903 -6904 -513 -6905 0
 6902  6903 -6904 -513  6906 0
 6902  6903 -6904 -513 -6907 0

c  2+1 --> break 
c    (-b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧  p_513) -> break
c  in CNF:
c     b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 6902 -6903  6904 -513 1162 0


c  2-1 --> 1
c    (-b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧ -p_513) -> (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0)
c  in CNF:
c     b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_2
c     b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_1
c     b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨  b^{3, 172}_0
c  in DIMACS:
 6902 -6903  6904  513 -6905 0
 6902 -6903  6904  513 -6906 0
 6902 -6903  6904  513  6907 0

c  1-1 --> 0
c    (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0 ∧ -p_513) -> (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧ -b^{3, 172}_0)
c  in CNF:
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_2
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_1
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_0
c  in DIMACS:
 6902  6903 -6904  513 -6905 0
 6902  6903 -6904  513 -6906 0
 6902  6903 -6904  513 -6907 0

c  0-1 --> -1
c    (-b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧ -p_513) -> ( b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0)
c  in CNF:
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨  b^{3, 172}_2
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_1
c     b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨  b^{3, 172}_0
c  in DIMACS:
 6902  6903  6904  513  6905 0
 6902  6903  6904  513 -6906 0
 6902  6903  6904  513  6907 0

c  -1-1 --> -2
c    ( b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧  b^{3, 171}_0 ∧ -p_513) -> ( b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0)
c  in CNF:
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨  b^{3, 172}_2
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨  b^{3, 172}_1
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨  p_513 ∨ -b^{3, 172}_0
c  in DIMACS:
-6902  6903 -6904  513  6905 0
-6902  6903 -6904  513  6906 0
-6902  6903 -6904  513 -6907 0

c  -2-1 --> break 
c    ( b^{3, 171}_2 ∧  b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨  b^{3, 171}_0 ∨  p_513 ∨ break
c  in DIMACS:
-6902 -6903  6904  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 171}_2 ∧ -b^{3, 171}_1 ∧ -b^{3, 171}_0 ∧ true) 
c  in CNF:
c    -b^{3, 171}_2 ∨  b^{3, 171}_1 ∨  b^{3, 171}_0 ∨ false 
c  in DIMACS:
-6902  6903  6904  0

c  3 does not represent an automaton state.
c    -(-b^{3, 171}_2 ∧  b^{3, 171}_1 ∧  b^{3, 171}_0 ∧ true) 
c  in CNF:
c     b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ false 
c  in DIMACS:
 6902 -6903 -6904  0
c  -3 does not represent an automaton state.
c    -( b^{3, 171}_2 ∧  b^{3, 171}_1 ∧  b^{3, 171}_0 ∧ true) 
c  in CNF:
c    -b^{3, 171}_2 ∨ -b^{3, 171}_1 ∨ -b^{3, 171}_0 ∨ false 
c  in DIMACS:
-6902 -6903 -6904  0

c i = 172
c  -2+1 --> -1
c    ( b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧  p_516) -> ( b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0)
c  in CNF:
c    -b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨  b^{3, 173}_2
c    -b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_1
c    -b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨  b^{3, 173}_0
c  in DIMACS:
-6905 -6906  6907 -516  6908 0
-6905 -6906  6907 -516 -6909 0
-6905 -6906  6907 -516  6910 0

c  -1+1 --> 0
c    ( b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0 ∧  p_516) -> (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧ -b^{3, 173}_0)
c  in CNF:
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_2
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_1
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_0
c  in DIMACS:
-6905  6906 -6907 -516 -6908 0
-6905  6906 -6907 -516 -6909 0
-6905  6906 -6907 -516 -6910 0

c  0+1 --> 1
c    (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧  p_516) -> (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0)
c  in CNF:
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_2
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_1
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨  b^{3, 173}_0
c  in DIMACS:
 6905  6906  6907 -516 -6908 0
 6905  6906  6907 -516 -6909 0
 6905  6906  6907 -516  6910 0

c  1+1 --> 2
c    (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0 ∧  p_516) -> (-b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0)
c  in CNF:
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_2
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨  b^{3, 173}_1
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ -p_516 ∨ -b^{3, 173}_0
c  in DIMACS:
 6905  6906 -6907 -516 -6908 0
 6905  6906 -6907 -516  6909 0
 6905  6906 -6907 -516 -6910 0

c  2+1 --> break 
c    (-b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧  p_516) -> break
c  in CNF:
c     b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 6905 -6906  6907 -516 1162 0


c  2-1 --> 1
c    (-b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧ -p_516) -> (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0)
c  in CNF:
c     b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_2
c     b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_1
c     b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨  b^{3, 173}_0
c  in DIMACS:
 6905 -6906  6907  516 -6908 0
 6905 -6906  6907  516 -6909 0
 6905 -6906  6907  516  6910 0

c  1-1 --> 0
c    (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0 ∧ -p_516) -> (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧ -b^{3, 173}_0)
c  in CNF:
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_2
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_1
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_0
c  in DIMACS:
 6905  6906 -6907  516 -6908 0
 6905  6906 -6907  516 -6909 0
 6905  6906 -6907  516 -6910 0

c  0-1 --> -1
c    (-b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧ -p_516) -> ( b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0)
c  in CNF:
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨  b^{3, 173}_2
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_1
c     b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨  b^{3, 173}_0
c  in DIMACS:
 6905  6906  6907  516  6908 0
 6905  6906  6907  516 -6909 0
 6905  6906  6907  516  6910 0

c  -1-1 --> -2
c    ( b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧  b^{3, 172}_0 ∧ -p_516) -> ( b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0)
c  in CNF:
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨  b^{3, 173}_2
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨  b^{3, 173}_1
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨  p_516 ∨ -b^{3, 173}_0
c  in DIMACS:
-6905  6906 -6907  516  6908 0
-6905  6906 -6907  516  6909 0
-6905  6906 -6907  516 -6910 0

c  -2-1 --> break 
c    ( b^{3, 172}_2 ∧  b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨  b^{3, 172}_0 ∨  p_516 ∨ break
c  in DIMACS:
-6905 -6906  6907  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 172}_2 ∧ -b^{3, 172}_1 ∧ -b^{3, 172}_0 ∧ true) 
c  in CNF:
c    -b^{3, 172}_2 ∨  b^{3, 172}_1 ∨  b^{3, 172}_0 ∨ false 
c  in DIMACS:
-6905  6906  6907  0

c  3 does not represent an automaton state.
c    -(-b^{3, 172}_2 ∧  b^{3, 172}_1 ∧  b^{3, 172}_0 ∧ true) 
c  in CNF:
c     b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ false 
c  in DIMACS:
 6905 -6906 -6907  0
c  -3 does not represent an automaton state.
c    -( b^{3, 172}_2 ∧  b^{3, 172}_1 ∧  b^{3, 172}_0 ∧ true) 
c  in CNF:
c    -b^{3, 172}_2 ∨ -b^{3, 172}_1 ∨ -b^{3, 172}_0 ∨ false 
c  in DIMACS:
-6905 -6906 -6907  0

c i = 173
c  -2+1 --> -1
c    ( b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧  p_519) -> ( b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0)
c  in CNF:
c    -b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨  b^{3, 174}_2
c    -b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_1
c    -b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨  b^{3, 174}_0
c  in DIMACS:
-6908 -6909  6910 -519  6911 0
-6908 -6909  6910 -519 -6912 0
-6908 -6909  6910 -519  6913 0

c  -1+1 --> 0
c    ( b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0 ∧  p_519) -> (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧ -b^{3, 174}_0)
c  in CNF:
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_2
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_1
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_0
c  in DIMACS:
-6908  6909 -6910 -519 -6911 0
-6908  6909 -6910 -519 -6912 0
-6908  6909 -6910 -519 -6913 0

c  0+1 --> 1
c    (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧  p_519) -> (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0)
c  in CNF:
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_2
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_1
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨  b^{3, 174}_0
c  in DIMACS:
 6908  6909  6910 -519 -6911 0
 6908  6909  6910 -519 -6912 0
 6908  6909  6910 -519  6913 0

c  1+1 --> 2
c    (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0 ∧  p_519) -> (-b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0)
c  in CNF:
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_2
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨  b^{3, 174}_1
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ -p_519 ∨ -b^{3, 174}_0
c  in DIMACS:
 6908  6909 -6910 -519 -6911 0
 6908  6909 -6910 -519  6912 0
 6908  6909 -6910 -519 -6913 0

c  2+1 --> break 
c    (-b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧  p_519) -> break
c  in CNF:
c     b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ -p_519 ∨ break
c  in DIMACS:
 6908 -6909  6910 -519 1162 0


c  2-1 --> 1
c    (-b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧ -p_519) -> (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0)
c  in CNF:
c     b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_2
c     b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_1
c     b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨  b^{3, 174}_0
c  in DIMACS:
 6908 -6909  6910  519 -6911 0
 6908 -6909  6910  519 -6912 0
 6908 -6909  6910  519  6913 0

c  1-1 --> 0
c    (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0 ∧ -p_519) -> (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧ -b^{3, 174}_0)
c  in CNF:
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_2
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_1
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_0
c  in DIMACS:
 6908  6909 -6910  519 -6911 0
 6908  6909 -6910  519 -6912 0
 6908  6909 -6910  519 -6913 0

c  0-1 --> -1
c    (-b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧ -p_519) -> ( b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0)
c  in CNF:
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨  b^{3, 174}_2
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_1
c     b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨  b^{3, 174}_0
c  in DIMACS:
 6908  6909  6910  519  6911 0
 6908  6909  6910  519 -6912 0
 6908  6909  6910  519  6913 0

c  -1-1 --> -2
c    ( b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧  b^{3, 173}_0 ∧ -p_519) -> ( b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0)
c  in CNF:
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨  b^{3, 174}_2
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨  b^{3, 174}_1
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨  p_519 ∨ -b^{3, 174}_0
c  in DIMACS:
-6908  6909 -6910  519  6911 0
-6908  6909 -6910  519  6912 0
-6908  6909 -6910  519 -6913 0

c  -2-1 --> break 
c    ( b^{3, 173}_2 ∧  b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧ -p_519) -> break
c  in CNF:
c    -b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨  b^{3, 173}_0 ∨  p_519 ∨ break
c  in DIMACS:
-6908 -6909  6910  519 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 173}_2 ∧ -b^{3, 173}_1 ∧ -b^{3, 173}_0 ∧ true) 
c  in CNF:
c    -b^{3, 173}_2 ∨  b^{3, 173}_1 ∨  b^{3, 173}_0 ∨ false 
c  in DIMACS:
-6908  6909  6910  0

c  3 does not represent an automaton state.
c    -(-b^{3, 173}_2 ∧  b^{3, 173}_1 ∧  b^{3, 173}_0 ∧ true) 
c  in CNF:
c     b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ false 
c  in DIMACS:
 6908 -6909 -6910  0
c  -3 does not represent an automaton state.
c    -( b^{3, 173}_2 ∧  b^{3, 173}_1 ∧  b^{3, 173}_0 ∧ true) 
c  in CNF:
c    -b^{3, 173}_2 ∨ -b^{3, 173}_1 ∨ -b^{3, 173}_0 ∨ false 
c  in DIMACS:
-6908 -6909 -6910  0

c i = 174
c  -2+1 --> -1
c    ( b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧  p_522) -> ( b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0)
c  in CNF:
c    -b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨  b^{3, 175}_2
c    -b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_1
c    -b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨  b^{3, 175}_0
c  in DIMACS:
-6911 -6912  6913 -522  6914 0
-6911 -6912  6913 -522 -6915 0
-6911 -6912  6913 -522  6916 0

c  -1+1 --> 0
c    ( b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0 ∧  p_522) -> (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧ -b^{3, 175}_0)
c  in CNF:
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_2
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_1
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_0
c  in DIMACS:
-6911  6912 -6913 -522 -6914 0
-6911  6912 -6913 -522 -6915 0
-6911  6912 -6913 -522 -6916 0

c  0+1 --> 1
c    (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧  p_522) -> (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0)
c  in CNF:
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_2
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_1
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨  b^{3, 175}_0
c  in DIMACS:
 6911  6912  6913 -522 -6914 0
 6911  6912  6913 -522 -6915 0
 6911  6912  6913 -522  6916 0

c  1+1 --> 2
c    (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0 ∧  p_522) -> (-b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0)
c  in CNF:
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_2
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨  b^{3, 175}_1
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ -p_522 ∨ -b^{3, 175}_0
c  in DIMACS:
 6911  6912 -6913 -522 -6914 0
 6911  6912 -6913 -522  6915 0
 6911  6912 -6913 -522 -6916 0

c  2+1 --> break 
c    (-b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧  p_522) -> break
c  in CNF:
c     b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 6911 -6912  6913 -522 1162 0


c  2-1 --> 1
c    (-b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧ -p_522) -> (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0)
c  in CNF:
c     b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_2
c     b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_1
c     b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨  b^{3, 175}_0
c  in DIMACS:
 6911 -6912  6913  522 -6914 0
 6911 -6912  6913  522 -6915 0
 6911 -6912  6913  522  6916 0

c  1-1 --> 0
c    (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0 ∧ -p_522) -> (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧ -b^{3, 175}_0)
c  in CNF:
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_2
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_1
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_0
c  in DIMACS:
 6911  6912 -6913  522 -6914 0
 6911  6912 -6913  522 -6915 0
 6911  6912 -6913  522 -6916 0

c  0-1 --> -1
c    (-b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧ -p_522) -> ( b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0)
c  in CNF:
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨  b^{3, 175}_2
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_1
c     b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨  b^{3, 175}_0
c  in DIMACS:
 6911  6912  6913  522  6914 0
 6911  6912  6913  522 -6915 0
 6911  6912  6913  522  6916 0

c  -1-1 --> -2
c    ( b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧  b^{3, 174}_0 ∧ -p_522) -> ( b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0)
c  in CNF:
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨  b^{3, 175}_2
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨  b^{3, 175}_1
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨  p_522 ∨ -b^{3, 175}_0
c  in DIMACS:
-6911  6912 -6913  522  6914 0
-6911  6912 -6913  522  6915 0
-6911  6912 -6913  522 -6916 0

c  -2-1 --> break 
c    ( b^{3, 174}_2 ∧  b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨  b^{3, 174}_0 ∨  p_522 ∨ break
c  in DIMACS:
-6911 -6912  6913  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 174}_2 ∧ -b^{3, 174}_1 ∧ -b^{3, 174}_0 ∧ true) 
c  in CNF:
c    -b^{3, 174}_2 ∨  b^{3, 174}_1 ∨  b^{3, 174}_0 ∨ false 
c  in DIMACS:
-6911  6912  6913  0

c  3 does not represent an automaton state.
c    -(-b^{3, 174}_2 ∧  b^{3, 174}_1 ∧  b^{3, 174}_0 ∧ true) 
c  in CNF:
c     b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ false 
c  in DIMACS:
 6911 -6912 -6913  0
c  -3 does not represent an automaton state.
c    -( b^{3, 174}_2 ∧  b^{3, 174}_1 ∧  b^{3, 174}_0 ∧ true) 
c  in CNF:
c    -b^{3, 174}_2 ∨ -b^{3, 174}_1 ∨ -b^{3, 174}_0 ∨ false 
c  in DIMACS:
-6911 -6912 -6913  0

c i = 175
c  -2+1 --> -1
c    ( b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧  p_525) -> ( b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0)
c  in CNF:
c    -b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨  b^{3, 176}_2
c    -b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_1
c    -b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨  b^{3, 176}_0
c  in DIMACS:
-6914 -6915  6916 -525  6917 0
-6914 -6915  6916 -525 -6918 0
-6914 -6915  6916 -525  6919 0

c  -1+1 --> 0
c    ( b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0 ∧  p_525) -> (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧ -b^{3, 176}_0)
c  in CNF:
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_2
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_1
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_0
c  in DIMACS:
-6914  6915 -6916 -525 -6917 0
-6914  6915 -6916 -525 -6918 0
-6914  6915 -6916 -525 -6919 0

c  0+1 --> 1
c    (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧  p_525) -> (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0)
c  in CNF:
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_2
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_1
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨  b^{3, 176}_0
c  in DIMACS:
 6914  6915  6916 -525 -6917 0
 6914  6915  6916 -525 -6918 0
 6914  6915  6916 -525  6919 0

c  1+1 --> 2
c    (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0 ∧  p_525) -> (-b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0)
c  in CNF:
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_2
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨  b^{3, 176}_1
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ -p_525 ∨ -b^{3, 176}_0
c  in DIMACS:
 6914  6915 -6916 -525 -6917 0
 6914  6915 -6916 -525  6918 0
 6914  6915 -6916 -525 -6919 0

c  2+1 --> break 
c    (-b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧  p_525) -> break
c  in CNF:
c     b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 6914 -6915  6916 -525 1162 0


c  2-1 --> 1
c    (-b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧ -p_525) -> (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0)
c  in CNF:
c     b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_2
c     b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_1
c     b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨  b^{3, 176}_0
c  in DIMACS:
 6914 -6915  6916  525 -6917 0
 6914 -6915  6916  525 -6918 0
 6914 -6915  6916  525  6919 0

c  1-1 --> 0
c    (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0 ∧ -p_525) -> (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧ -b^{3, 176}_0)
c  in CNF:
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_2
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_1
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_0
c  in DIMACS:
 6914  6915 -6916  525 -6917 0
 6914  6915 -6916  525 -6918 0
 6914  6915 -6916  525 -6919 0

c  0-1 --> -1
c    (-b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧ -p_525) -> ( b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0)
c  in CNF:
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨  b^{3, 176}_2
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_1
c     b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨  b^{3, 176}_0
c  in DIMACS:
 6914  6915  6916  525  6917 0
 6914  6915  6916  525 -6918 0
 6914  6915  6916  525  6919 0

c  -1-1 --> -2
c    ( b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧  b^{3, 175}_0 ∧ -p_525) -> ( b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0)
c  in CNF:
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨  b^{3, 176}_2
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨  b^{3, 176}_1
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨  p_525 ∨ -b^{3, 176}_0
c  in DIMACS:
-6914  6915 -6916  525  6917 0
-6914  6915 -6916  525  6918 0
-6914  6915 -6916  525 -6919 0

c  -2-1 --> break 
c    ( b^{3, 175}_2 ∧  b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨  b^{3, 175}_0 ∨  p_525 ∨ break
c  in DIMACS:
-6914 -6915  6916  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 175}_2 ∧ -b^{3, 175}_1 ∧ -b^{3, 175}_0 ∧ true) 
c  in CNF:
c    -b^{3, 175}_2 ∨  b^{3, 175}_1 ∨  b^{3, 175}_0 ∨ false 
c  in DIMACS:
-6914  6915  6916  0

c  3 does not represent an automaton state.
c    -(-b^{3, 175}_2 ∧  b^{3, 175}_1 ∧  b^{3, 175}_0 ∧ true) 
c  in CNF:
c     b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ false 
c  in DIMACS:
 6914 -6915 -6916  0
c  -3 does not represent an automaton state.
c    -( b^{3, 175}_2 ∧  b^{3, 175}_1 ∧  b^{3, 175}_0 ∧ true) 
c  in CNF:
c    -b^{3, 175}_2 ∨ -b^{3, 175}_1 ∨ -b^{3, 175}_0 ∨ false 
c  in DIMACS:
-6914 -6915 -6916  0

c i = 176
c  -2+1 --> -1
c    ( b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧  p_528) -> ( b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0)
c  in CNF:
c    -b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨  b^{3, 177}_2
c    -b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_1
c    -b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨  b^{3, 177}_0
c  in DIMACS:
-6917 -6918  6919 -528  6920 0
-6917 -6918  6919 -528 -6921 0
-6917 -6918  6919 -528  6922 0

c  -1+1 --> 0
c    ( b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0 ∧  p_528) -> (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧ -b^{3, 177}_0)
c  in CNF:
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_2
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_1
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_0
c  in DIMACS:
-6917  6918 -6919 -528 -6920 0
-6917  6918 -6919 -528 -6921 0
-6917  6918 -6919 -528 -6922 0

c  0+1 --> 1
c    (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧  p_528) -> (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0)
c  in CNF:
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_2
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_1
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨  b^{3, 177}_0
c  in DIMACS:
 6917  6918  6919 -528 -6920 0
 6917  6918  6919 -528 -6921 0
 6917  6918  6919 -528  6922 0

c  1+1 --> 2
c    (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0 ∧  p_528) -> (-b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0)
c  in CNF:
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_2
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨  b^{3, 177}_1
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ -p_528 ∨ -b^{3, 177}_0
c  in DIMACS:
 6917  6918 -6919 -528 -6920 0
 6917  6918 -6919 -528  6921 0
 6917  6918 -6919 -528 -6922 0

c  2+1 --> break 
c    (-b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧  p_528) -> break
c  in CNF:
c     b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 6917 -6918  6919 -528 1162 0


c  2-1 --> 1
c    (-b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧ -p_528) -> (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0)
c  in CNF:
c     b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_2
c     b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_1
c     b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨  b^{3, 177}_0
c  in DIMACS:
 6917 -6918  6919  528 -6920 0
 6917 -6918  6919  528 -6921 0
 6917 -6918  6919  528  6922 0

c  1-1 --> 0
c    (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0 ∧ -p_528) -> (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧ -b^{3, 177}_0)
c  in CNF:
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_2
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_1
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_0
c  in DIMACS:
 6917  6918 -6919  528 -6920 0
 6917  6918 -6919  528 -6921 0
 6917  6918 -6919  528 -6922 0

c  0-1 --> -1
c    (-b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧ -p_528) -> ( b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0)
c  in CNF:
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨  b^{3, 177}_2
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_1
c     b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨  b^{3, 177}_0
c  in DIMACS:
 6917  6918  6919  528  6920 0
 6917  6918  6919  528 -6921 0
 6917  6918  6919  528  6922 0

c  -1-1 --> -2
c    ( b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧  b^{3, 176}_0 ∧ -p_528) -> ( b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0)
c  in CNF:
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨  b^{3, 177}_2
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨  b^{3, 177}_1
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨  p_528 ∨ -b^{3, 177}_0
c  in DIMACS:
-6917  6918 -6919  528  6920 0
-6917  6918 -6919  528  6921 0
-6917  6918 -6919  528 -6922 0

c  -2-1 --> break 
c    ( b^{3, 176}_2 ∧  b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨  b^{3, 176}_0 ∨  p_528 ∨ break
c  in DIMACS:
-6917 -6918  6919  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 176}_2 ∧ -b^{3, 176}_1 ∧ -b^{3, 176}_0 ∧ true) 
c  in CNF:
c    -b^{3, 176}_2 ∨  b^{3, 176}_1 ∨  b^{3, 176}_0 ∨ false 
c  in DIMACS:
-6917  6918  6919  0

c  3 does not represent an automaton state.
c    -(-b^{3, 176}_2 ∧  b^{3, 176}_1 ∧  b^{3, 176}_0 ∧ true) 
c  in CNF:
c     b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ false 
c  in DIMACS:
 6917 -6918 -6919  0
c  -3 does not represent an automaton state.
c    -( b^{3, 176}_2 ∧  b^{3, 176}_1 ∧  b^{3, 176}_0 ∧ true) 
c  in CNF:
c    -b^{3, 176}_2 ∨ -b^{3, 176}_1 ∨ -b^{3, 176}_0 ∨ false 
c  in DIMACS:
-6917 -6918 -6919  0

c i = 177
c  -2+1 --> -1
c    ( b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧  p_531) -> ( b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0)
c  in CNF:
c    -b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨  b^{3, 178}_2
c    -b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_1
c    -b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨  b^{3, 178}_0
c  in DIMACS:
-6920 -6921  6922 -531  6923 0
-6920 -6921  6922 -531 -6924 0
-6920 -6921  6922 -531  6925 0

c  -1+1 --> 0
c    ( b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0 ∧  p_531) -> (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧ -b^{3, 178}_0)
c  in CNF:
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_2
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_1
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_0
c  in DIMACS:
-6920  6921 -6922 -531 -6923 0
-6920  6921 -6922 -531 -6924 0
-6920  6921 -6922 -531 -6925 0

c  0+1 --> 1
c    (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧  p_531) -> (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0)
c  in CNF:
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_2
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_1
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨  b^{3, 178}_0
c  in DIMACS:
 6920  6921  6922 -531 -6923 0
 6920  6921  6922 -531 -6924 0
 6920  6921  6922 -531  6925 0

c  1+1 --> 2
c    (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0 ∧  p_531) -> (-b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0)
c  in CNF:
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_2
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨  b^{3, 178}_1
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ -p_531 ∨ -b^{3, 178}_0
c  in DIMACS:
 6920  6921 -6922 -531 -6923 0
 6920  6921 -6922 -531  6924 0
 6920  6921 -6922 -531 -6925 0

c  2+1 --> break 
c    (-b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧  p_531) -> break
c  in CNF:
c     b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ -p_531 ∨ break
c  in DIMACS:
 6920 -6921  6922 -531 1162 0


c  2-1 --> 1
c    (-b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧ -p_531) -> (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0)
c  in CNF:
c     b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_2
c     b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_1
c     b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨  b^{3, 178}_0
c  in DIMACS:
 6920 -6921  6922  531 -6923 0
 6920 -6921  6922  531 -6924 0
 6920 -6921  6922  531  6925 0

c  1-1 --> 0
c    (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0 ∧ -p_531) -> (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧ -b^{3, 178}_0)
c  in CNF:
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_2
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_1
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_0
c  in DIMACS:
 6920  6921 -6922  531 -6923 0
 6920  6921 -6922  531 -6924 0
 6920  6921 -6922  531 -6925 0

c  0-1 --> -1
c    (-b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧ -p_531) -> ( b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0)
c  in CNF:
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨  b^{3, 178}_2
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_1
c     b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨  b^{3, 178}_0
c  in DIMACS:
 6920  6921  6922  531  6923 0
 6920  6921  6922  531 -6924 0
 6920  6921  6922  531  6925 0

c  -1-1 --> -2
c    ( b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧  b^{3, 177}_0 ∧ -p_531) -> ( b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0)
c  in CNF:
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨  b^{3, 178}_2
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨  b^{3, 178}_1
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨  p_531 ∨ -b^{3, 178}_0
c  in DIMACS:
-6920  6921 -6922  531  6923 0
-6920  6921 -6922  531  6924 0
-6920  6921 -6922  531 -6925 0

c  -2-1 --> break 
c    ( b^{3, 177}_2 ∧  b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧ -p_531) -> break
c  in CNF:
c    -b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨  b^{3, 177}_0 ∨  p_531 ∨ break
c  in DIMACS:
-6920 -6921  6922  531 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 177}_2 ∧ -b^{3, 177}_1 ∧ -b^{3, 177}_0 ∧ true) 
c  in CNF:
c    -b^{3, 177}_2 ∨  b^{3, 177}_1 ∨  b^{3, 177}_0 ∨ false 
c  in DIMACS:
-6920  6921  6922  0

c  3 does not represent an automaton state.
c    -(-b^{3, 177}_2 ∧  b^{3, 177}_1 ∧  b^{3, 177}_0 ∧ true) 
c  in CNF:
c     b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ false 
c  in DIMACS:
 6920 -6921 -6922  0
c  -3 does not represent an automaton state.
c    -( b^{3, 177}_2 ∧  b^{3, 177}_1 ∧  b^{3, 177}_0 ∧ true) 
c  in CNF:
c    -b^{3, 177}_2 ∨ -b^{3, 177}_1 ∨ -b^{3, 177}_0 ∨ false 
c  in DIMACS:
-6920 -6921 -6922  0

c i = 178
c  -2+1 --> -1
c    ( b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧  p_534) -> ( b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0)
c  in CNF:
c    -b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨  b^{3, 179}_2
c    -b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_1
c    -b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨  b^{3, 179}_0
c  in DIMACS:
-6923 -6924  6925 -534  6926 0
-6923 -6924  6925 -534 -6927 0
-6923 -6924  6925 -534  6928 0

c  -1+1 --> 0
c    ( b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0 ∧  p_534) -> (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧ -b^{3, 179}_0)
c  in CNF:
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_2
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_1
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_0
c  in DIMACS:
-6923  6924 -6925 -534 -6926 0
-6923  6924 -6925 -534 -6927 0
-6923  6924 -6925 -534 -6928 0

c  0+1 --> 1
c    (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧  p_534) -> (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0)
c  in CNF:
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_2
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_1
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨  b^{3, 179}_0
c  in DIMACS:
 6923  6924  6925 -534 -6926 0
 6923  6924  6925 -534 -6927 0
 6923  6924  6925 -534  6928 0

c  1+1 --> 2
c    (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0 ∧  p_534) -> (-b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0)
c  in CNF:
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_2
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨  b^{3, 179}_1
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ -p_534 ∨ -b^{3, 179}_0
c  in DIMACS:
 6923  6924 -6925 -534 -6926 0
 6923  6924 -6925 -534  6927 0
 6923  6924 -6925 -534 -6928 0

c  2+1 --> break 
c    (-b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧  p_534) -> break
c  in CNF:
c     b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 6923 -6924  6925 -534 1162 0


c  2-1 --> 1
c    (-b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧ -p_534) -> (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0)
c  in CNF:
c     b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_2
c     b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_1
c     b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨  b^{3, 179}_0
c  in DIMACS:
 6923 -6924  6925  534 -6926 0
 6923 -6924  6925  534 -6927 0
 6923 -6924  6925  534  6928 0

c  1-1 --> 0
c    (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0 ∧ -p_534) -> (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧ -b^{3, 179}_0)
c  in CNF:
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_2
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_1
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_0
c  in DIMACS:
 6923  6924 -6925  534 -6926 0
 6923  6924 -6925  534 -6927 0
 6923  6924 -6925  534 -6928 0

c  0-1 --> -1
c    (-b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧ -p_534) -> ( b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0)
c  in CNF:
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨  b^{3, 179}_2
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_1
c     b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨  b^{3, 179}_0
c  in DIMACS:
 6923  6924  6925  534  6926 0
 6923  6924  6925  534 -6927 0
 6923  6924  6925  534  6928 0

c  -1-1 --> -2
c    ( b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧  b^{3, 178}_0 ∧ -p_534) -> ( b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0)
c  in CNF:
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨  b^{3, 179}_2
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨  b^{3, 179}_1
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨  p_534 ∨ -b^{3, 179}_0
c  in DIMACS:
-6923  6924 -6925  534  6926 0
-6923  6924 -6925  534  6927 0
-6923  6924 -6925  534 -6928 0

c  -2-1 --> break 
c    ( b^{3, 178}_2 ∧  b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨  b^{3, 178}_0 ∨  p_534 ∨ break
c  in DIMACS:
-6923 -6924  6925  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 178}_2 ∧ -b^{3, 178}_1 ∧ -b^{3, 178}_0 ∧ true) 
c  in CNF:
c    -b^{3, 178}_2 ∨  b^{3, 178}_1 ∨  b^{3, 178}_0 ∨ false 
c  in DIMACS:
-6923  6924  6925  0

c  3 does not represent an automaton state.
c    -(-b^{3, 178}_2 ∧  b^{3, 178}_1 ∧  b^{3, 178}_0 ∧ true) 
c  in CNF:
c     b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ false 
c  in DIMACS:
 6923 -6924 -6925  0
c  -3 does not represent an automaton state.
c    -( b^{3, 178}_2 ∧  b^{3, 178}_1 ∧  b^{3, 178}_0 ∧ true) 
c  in CNF:
c    -b^{3, 178}_2 ∨ -b^{3, 178}_1 ∨ -b^{3, 178}_0 ∨ false 
c  in DIMACS:
-6923 -6924 -6925  0

c i = 179
c  -2+1 --> -1
c    ( b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧  p_537) -> ( b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0)
c  in CNF:
c    -b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨  b^{3, 180}_2
c    -b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_1
c    -b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨  b^{3, 180}_0
c  in DIMACS:
-6926 -6927  6928 -537  6929 0
-6926 -6927  6928 -537 -6930 0
-6926 -6927  6928 -537  6931 0

c  -1+1 --> 0
c    ( b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0 ∧  p_537) -> (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧ -b^{3, 180}_0)
c  in CNF:
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_2
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_1
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_0
c  in DIMACS:
-6926  6927 -6928 -537 -6929 0
-6926  6927 -6928 -537 -6930 0
-6926  6927 -6928 -537 -6931 0

c  0+1 --> 1
c    (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧  p_537) -> (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0)
c  in CNF:
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_2
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_1
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨  b^{3, 180}_0
c  in DIMACS:
 6926  6927  6928 -537 -6929 0
 6926  6927  6928 -537 -6930 0
 6926  6927  6928 -537  6931 0

c  1+1 --> 2
c    (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0 ∧  p_537) -> (-b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0)
c  in CNF:
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_2
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨  b^{3, 180}_1
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ -p_537 ∨ -b^{3, 180}_0
c  in DIMACS:
 6926  6927 -6928 -537 -6929 0
 6926  6927 -6928 -537  6930 0
 6926  6927 -6928 -537 -6931 0

c  2+1 --> break 
c    (-b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧  p_537) -> break
c  in CNF:
c     b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ -p_537 ∨ break
c  in DIMACS:
 6926 -6927  6928 -537 1162 0


c  2-1 --> 1
c    (-b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧ -p_537) -> (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0)
c  in CNF:
c     b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_2
c     b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_1
c     b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨  b^{3, 180}_0
c  in DIMACS:
 6926 -6927  6928  537 -6929 0
 6926 -6927  6928  537 -6930 0
 6926 -6927  6928  537  6931 0

c  1-1 --> 0
c    (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0 ∧ -p_537) -> (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧ -b^{3, 180}_0)
c  in CNF:
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_2
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_1
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_0
c  in DIMACS:
 6926  6927 -6928  537 -6929 0
 6926  6927 -6928  537 -6930 0
 6926  6927 -6928  537 -6931 0

c  0-1 --> -1
c    (-b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧ -p_537) -> ( b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0)
c  in CNF:
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨  b^{3, 180}_2
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_1
c     b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨  b^{3, 180}_0
c  in DIMACS:
 6926  6927  6928  537  6929 0
 6926  6927  6928  537 -6930 0
 6926  6927  6928  537  6931 0

c  -1-1 --> -2
c    ( b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧  b^{3, 179}_0 ∧ -p_537) -> ( b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0)
c  in CNF:
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨  b^{3, 180}_2
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨  b^{3, 180}_1
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨  p_537 ∨ -b^{3, 180}_0
c  in DIMACS:
-6926  6927 -6928  537  6929 0
-6926  6927 -6928  537  6930 0
-6926  6927 -6928  537 -6931 0

c  -2-1 --> break 
c    ( b^{3, 179}_2 ∧  b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧ -p_537) -> break
c  in CNF:
c    -b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨  b^{3, 179}_0 ∨  p_537 ∨ break
c  in DIMACS:
-6926 -6927  6928  537 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 179}_2 ∧ -b^{3, 179}_1 ∧ -b^{3, 179}_0 ∧ true) 
c  in CNF:
c    -b^{3, 179}_2 ∨  b^{3, 179}_1 ∨  b^{3, 179}_0 ∨ false 
c  in DIMACS:
-6926  6927  6928  0

c  3 does not represent an automaton state.
c    -(-b^{3, 179}_2 ∧  b^{3, 179}_1 ∧  b^{3, 179}_0 ∧ true) 
c  in CNF:
c     b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ false 
c  in DIMACS:
 6926 -6927 -6928  0
c  -3 does not represent an automaton state.
c    -( b^{3, 179}_2 ∧  b^{3, 179}_1 ∧  b^{3, 179}_0 ∧ true) 
c  in CNF:
c    -b^{3, 179}_2 ∨ -b^{3, 179}_1 ∨ -b^{3, 179}_0 ∨ false 
c  in DIMACS:
-6926 -6927 -6928  0

c i = 180
c  -2+1 --> -1
c    ( b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧  p_540) -> ( b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0)
c  in CNF:
c    -b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨  b^{3, 181}_2
c    -b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_1
c    -b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨  b^{3, 181}_0
c  in DIMACS:
-6929 -6930  6931 -540  6932 0
-6929 -6930  6931 -540 -6933 0
-6929 -6930  6931 -540  6934 0

c  -1+1 --> 0
c    ( b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0 ∧  p_540) -> (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧ -b^{3, 181}_0)
c  in CNF:
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_2
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_1
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_0
c  in DIMACS:
-6929  6930 -6931 -540 -6932 0
-6929  6930 -6931 -540 -6933 0
-6929  6930 -6931 -540 -6934 0

c  0+1 --> 1
c    (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧  p_540) -> (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0)
c  in CNF:
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_2
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_1
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨  b^{3, 181}_0
c  in DIMACS:
 6929  6930  6931 -540 -6932 0
 6929  6930  6931 -540 -6933 0
 6929  6930  6931 -540  6934 0

c  1+1 --> 2
c    (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0 ∧  p_540) -> (-b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0)
c  in CNF:
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_2
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨  b^{3, 181}_1
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ -p_540 ∨ -b^{3, 181}_0
c  in DIMACS:
 6929  6930 -6931 -540 -6932 0
 6929  6930 -6931 -540  6933 0
 6929  6930 -6931 -540 -6934 0

c  2+1 --> break 
c    (-b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧  p_540) -> break
c  in CNF:
c     b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 6929 -6930  6931 -540 1162 0


c  2-1 --> 1
c    (-b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧ -p_540) -> (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0)
c  in CNF:
c     b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_2
c     b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_1
c     b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨  b^{3, 181}_0
c  in DIMACS:
 6929 -6930  6931  540 -6932 0
 6929 -6930  6931  540 -6933 0
 6929 -6930  6931  540  6934 0

c  1-1 --> 0
c    (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0 ∧ -p_540) -> (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧ -b^{3, 181}_0)
c  in CNF:
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_2
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_1
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_0
c  in DIMACS:
 6929  6930 -6931  540 -6932 0
 6929  6930 -6931  540 -6933 0
 6929  6930 -6931  540 -6934 0

c  0-1 --> -1
c    (-b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧ -p_540) -> ( b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0)
c  in CNF:
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨  b^{3, 181}_2
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_1
c     b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨  b^{3, 181}_0
c  in DIMACS:
 6929  6930  6931  540  6932 0
 6929  6930  6931  540 -6933 0
 6929  6930  6931  540  6934 0

c  -1-1 --> -2
c    ( b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧  b^{3, 180}_0 ∧ -p_540) -> ( b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0)
c  in CNF:
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨  b^{3, 181}_2
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨  b^{3, 181}_1
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨  p_540 ∨ -b^{3, 181}_0
c  in DIMACS:
-6929  6930 -6931  540  6932 0
-6929  6930 -6931  540  6933 0
-6929  6930 -6931  540 -6934 0

c  -2-1 --> break 
c    ( b^{3, 180}_2 ∧  b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨  b^{3, 180}_0 ∨  p_540 ∨ break
c  in DIMACS:
-6929 -6930  6931  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 180}_2 ∧ -b^{3, 180}_1 ∧ -b^{3, 180}_0 ∧ true) 
c  in CNF:
c    -b^{3, 180}_2 ∨  b^{3, 180}_1 ∨  b^{3, 180}_0 ∨ false 
c  in DIMACS:
-6929  6930  6931  0

c  3 does not represent an automaton state.
c    -(-b^{3, 180}_2 ∧  b^{3, 180}_1 ∧  b^{3, 180}_0 ∧ true) 
c  in CNF:
c     b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ false 
c  in DIMACS:
 6929 -6930 -6931  0
c  -3 does not represent an automaton state.
c    -( b^{3, 180}_2 ∧  b^{3, 180}_1 ∧  b^{3, 180}_0 ∧ true) 
c  in CNF:
c    -b^{3, 180}_2 ∨ -b^{3, 180}_1 ∨ -b^{3, 180}_0 ∨ false 
c  in DIMACS:
-6929 -6930 -6931  0

c i = 181
c  -2+1 --> -1
c    ( b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧  p_543) -> ( b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0)
c  in CNF:
c    -b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨  b^{3, 182}_2
c    -b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_1
c    -b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨  b^{3, 182}_0
c  in DIMACS:
-6932 -6933  6934 -543  6935 0
-6932 -6933  6934 -543 -6936 0
-6932 -6933  6934 -543  6937 0

c  -1+1 --> 0
c    ( b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0 ∧  p_543) -> (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧ -b^{3, 182}_0)
c  in CNF:
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_2
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_1
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_0
c  in DIMACS:
-6932  6933 -6934 -543 -6935 0
-6932  6933 -6934 -543 -6936 0
-6932  6933 -6934 -543 -6937 0

c  0+1 --> 1
c    (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧  p_543) -> (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0)
c  in CNF:
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_2
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_1
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨  b^{3, 182}_0
c  in DIMACS:
 6932  6933  6934 -543 -6935 0
 6932  6933  6934 -543 -6936 0
 6932  6933  6934 -543  6937 0

c  1+1 --> 2
c    (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0 ∧  p_543) -> (-b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0)
c  in CNF:
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_2
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨  b^{3, 182}_1
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ -p_543 ∨ -b^{3, 182}_0
c  in DIMACS:
 6932  6933 -6934 -543 -6935 0
 6932  6933 -6934 -543  6936 0
 6932  6933 -6934 -543 -6937 0

c  2+1 --> break 
c    (-b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧  p_543) -> break
c  in CNF:
c     b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ -p_543 ∨ break
c  in DIMACS:
 6932 -6933  6934 -543 1162 0


c  2-1 --> 1
c    (-b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧ -p_543) -> (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0)
c  in CNF:
c     b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_2
c     b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_1
c     b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨  b^{3, 182}_0
c  in DIMACS:
 6932 -6933  6934  543 -6935 0
 6932 -6933  6934  543 -6936 0
 6932 -6933  6934  543  6937 0

c  1-1 --> 0
c    (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0 ∧ -p_543) -> (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧ -b^{3, 182}_0)
c  in CNF:
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_2
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_1
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_0
c  in DIMACS:
 6932  6933 -6934  543 -6935 0
 6932  6933 -6934  543 -6936 0
 6932  6933 -6934  543 -6937 0

c  0-1 --> -1
c    (-b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧ -p_543) -> ( b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0)
c  in CNF:
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨  b^{3, 182}_2
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_1
c     b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨  b^{3, 182}_0
c  in DIMACS:
 6932  6933  6934  543  6935 0
 6932  6933  6934  543 -6936 0
 6932  6933  6934  543  6937 0

c  -1-1 --> -2
c    ( b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧  b^{3, 181}_0 ∧ -p_543) -> ( b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0)
c  in CNF:
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨  b^{3, 182}_2
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨  b^{3, 182}_1
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨  p_543 ∨ -b^{3, 182}_0
c  in DIMACS:
-6932  6933 -6934  543  6935 0
-6932  6933 -6934  543  6936 0
-6932  6933 -6934  543 -6937 0

c  -2-1 --> break 
c    ( b^{3, 181}_2 ∧  b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧ -p_543) -> break
c  in CNF:
c    -b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨  b^{3, 181}_0 ∨  p_543 ∨ break
c  in DIMACS:
-6932 -6933  6934  543 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 181}_2 ∧ -b^{3, 181}_1 ∧ -b^{3, 181}_0 ∧ true) 
c  in CNF:
c    -b^{3, 181}_2 ∨  b^{3, 181}_1 ∨  b^{3, 181}_0 ∨ false 
c  in DIMACS:
-6932  6933  6934  0

c  3 does not represent an automaton state.
c    -(-b^{3, 181}_2 ∧  b^{3, 181}_1 ∧  b^{3, 181}_0 ∧ true) 
c  in CNF:
c     b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ false 
c  in DIMACS:
 6932 -6933 -6934  0
c  -3 does not represent an automaton state.
c    -( b^{3, 181}_2 ∧  b^{3, 181}_1 ∧  b^{3, 181}_0 ∧ true) 
c  in CNF:
c    -b^{3, 181}_2 ∨ -b^{3, 181}_1 ∨ -b^{3, 181}_0 ∨ false 
c  in DIMACS:
-6932 -6933 -6934  0

c i = 182
c  -2+1 --> -1
c    ( b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧  p_546) -> ( b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0)
c  in CNF:
c    -b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨  b^{3, 183}_2
c    -b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_1
c    -b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨  b^{3, 183}_0
c  in DIMACS:
-6935 -6936  6937 -546  6938 0
-6935 -6936  6937 -546 -6939 0
-6935 -6936  6937 -546  6940 0

c  -1+1 --> 0
c    ( b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0 ∧  p_546) -> (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧ -b^{3, 183}_0)
c  in CNF:
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_2
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_1
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_0
c  in DIMACS:
-6935  6936 -6937 -546 -6938 0
-6935  6936 -6937 -546 -6939 0
-6935  6936 -6937 -546 -6940 0

c  0+1 --> 1
c    (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧  p_546) -> (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0)
c  in CNF:
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_2
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_1
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨  b^{3, 183}_0
c  in DIMACS:
 6935  6936  6937 -546 -6938 0
 6935  6936  6937 -546 -6939 0
 6935  6936  6937 -546  6940 0

c  1+1 --> 2
c    (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0 ∧  p_546) -> (-b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0)
c  in CNF:
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_2
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨  b^{3, 183}_1
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ -p_546 ∨ -b^{3, 183}_0
c  in DIMACS:
 6935  6936 -6937 -546 -6938 0
 6935  6936 -6937 -546  6939 0
 6935  6936 -6937 -546 -6940 0

c  2+1 --> break 
c    (-b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧  p_546) -> break
c  in CNF:
c     b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 6935 -6936  6937 -546 1162 0


c  2-1 --> 1
c    (-b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧ -p_546) -> (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0)
c  in CNF:
c     b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_2
c     b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_1
c     b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨  b^{3, 183}_0
c  in DIMACS:
 6935 -6936  6937  546 -6938 0
 6935 -6936  6937  546 -6939 0
 6935 -6936  6937  546  6940 0

c  1-1 --> 0
c    (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0 ∧ -p_546) -> (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧ -b^{3, 183}_0)
c  in CNF:
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_2
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_1
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_0
c  in DIMACS:
 6935  6936 -6937  546 -6938 0
 6935  6936 -6937  546 -6939 0
 6935  6936 -6937  546 -6940 0

c  0-1 --> -1
c    (-b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧ -p_546) -> ( b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0)
c  in CNF:
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨  b^{3, 183}_2
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_1
c     b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨  b^{3, 183}_0
c  in DIMACS:
 6935  6936  6937  546  6938 0
 6935  6936  6937  546 -6939 0
 6935  6936  6937  546  6940 0

c  -1-1 --> -2
c    ( b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧  b^{3, 182}_0 ∧ -p_546) -> ( b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0)
c  in CNF:
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨  b^{3, 183}_2
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨  b^{3, 183}_1
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨  p_546 ∨ -b^{3, 183}_0
c  in DIMACS:
-6935  6936 -6937  546  6938 0
-6935  6936 -6937  546  6939 0
-6935  6936 -6937  546 -6940 0

c  -2-1 --> break 
c    ( b^{3, 182}_2 ∧  b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨  b^{3, 182}_0 ∨  p_546 ∨ break
c  in DIMACS:
-6935 -6936  6937  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 182}_2 ∧ -b^{3, 182}_1 ∧ -b^{3, 182}_0 ∧ true) 
c  in CNF:
c    -b^{3, 182}_2 ∨  b^{3, 182}_1 ∨  b^{3, 182}_0 ∨ false 
c  in DIMACS:
-6935  6936  6937  0

c  3 does not represent an automaton state.
c    -(-b^{3, 182}_2 ∧  b^{3, 182}_1 ∧  b^{3, 182}_0 ∧ true) 
c  in CNF:
c     b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ false 
c  in DIMACS:
 6935 -6936 -6937  0
c  -3 does not represent an automaton state.
c    -( b^{3, 182}_2 ∧  b^{3, 182}_1 ∧  b^{3, 182}_0 ∧ true) 
c  in CNF:
c    -b^{3, 182}_2 ∨ -b^{3, 182}_1 ∨ -b^{3, 182}_0 ∨ false 
c  in DIMACS:
-6935 -6936 -6937  0

c i = 183
c  -2+1 --> -1
c    ( b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧  p_549) -> ( b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0)
c  in CNF:
c    -b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨  b^{3, 184}_2
c    -b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_1
c    -b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨  b^{3, 184}_0
c  in DIMACS:
-6938 -6939  6940 -549  6941 0
-6938 -6939  6940 -549 -6942 0
-6938 -6939  6940 -549  6943 0

c  -1+1 --> 0
c    ( b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0 ∧  p_549) -> (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧ -b^{3, 184}_0)
c  in CNF:
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_2
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_1
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_0
c  in DIMACS:
-6938  6939 -6940 -549 -6941 0
-6938  6939 -6940 -549 -6942 0
-6938  6939 -6940 -549 -6943 0

c  0+1 --> 1
c    (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧  p_549) -> (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0)
c  in CNF:
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_2
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_1
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨  b^{3, 184}_0
c  in DIMACS:
 6938  6939  6940 -549 -6941 0
 6938  6939  6940 -549 -6942 0
 6938  6939  6940 -549  6943 0

c  1+1 --> 2
c    (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0 ∧  p_549) -> (-b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0)
c  in CNF:
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_2
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨  b^{3, 184}_1
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ -p_549 ∨ -b^{3, 184}_0
c  in DIMACS:
 6938  6939 -6940 -549 -6941 0
 6938  6939 -6940 -549  6942 0
 6938  6939 -6940 -549 -6943 0

c  2+1 --> break 
c    (-b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧  p_549) -> break
c  in CNF:
c     b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ -p_549 ∨ break
c  in DIMACS:
 6938 -6939  6940 -549 1162 0


c  2-1 --> 1
c    (-b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧ -p_549) -> (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0)
c  in CNF:
c     b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_2
c     b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_1
c     b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨  b^{3, 184}_0
c  in DIMACS:
 6938 -6939  6940  549 -6941 0
 6938 -6939  6940  549 -6942 0
 6938 -6939  6940  549  6943 0

c  1-1 --> 0
c    (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0 ∧ -p_549) -> (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧ -b^{3, 184}_0)
c  in CNF:
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_2
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_1
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_0
c  in DIMACS:
 6938  6939 -6940  549 -6941 0
 6938  6939 -6940  549 -6942 0
 6938  6939 -6940  549 -6943 0

c  0-1 --> -1
c    (-b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧ -p_549) -> ( b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0)
c  in CNF:
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨  b^{3, 184}_2
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_1
c     b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨  b^{3, 184}_0
c  in DIMACS:
 6938  6939  6940  549  6941 0
 6938  6939  6940  549 -6942 0
 6938  6939  6940  549  6943 0

c  -1-1 --> -2
c    ( b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧  b^{3, 183}_0 ∧ -p_549) -> ( b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0)
c  in CNF:
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨  b^{3, 184}_2
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨  b^{3, 184}_1
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨  p_549 ∨ -b^{3, 184}_0
c  in DIMACS:
-6938  6939 -6940  549  6941 0
-6938  6939 -6940  549  6942 0
-6938  6939 -6940  549 -6943 0

c  -2-1 --> break 
c    ( b^{3, 183}_2 ∧  b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧ -p_549) -> break
c  in CNF:
c    -b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨  b^{3, 183}_0 ∨  p_549 ∨ break
c  in DIMACS:
-6938 -6939  6940  549 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 183}_2 ∧ -b^{3, 183}_1 ∧ -b^{3, 183}_0 ∧ true) 
c  in CNF:
c    -b^{3, 183}_2 ∨  b^{3, 183}_1 ∨  b^{3, 183}_0 ∨ false 
c  in DIMACS:
-6938  6939  6940  0

c  3 does not represent an automaton state.
c    -(-b^{3, 183}_2 ∧  b^{3, 183}_1 ∧  b^{3, 183}_0 ∧ true) 
c  in CNF:
c     b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ false 
c  in DIMACS:
 6938 -6939 -6940  0
c  -3 does not represent an automaton state.
c    -( b^{3, 183}_2 ∧  b^{3, 183}_1 ∧  b^{3, 183}_0 ∧ true) 
c  in CNF:
c    -b^{3, 183}_2 ∨ -b^{3, 183}_1 ∨ -b^{3, 183}_0 ∨ false 
c  in DIMACS:
-6938 -6939 -6940  0

c i = 184
c  -2+1 --> -1
c    ( b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧  p_552) -> ( b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0)
c  in CNF:
c    -b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨  b^{3, 185}_2
c    -b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_1
c    -b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨  b^{3, 185}_0
c  in DIMACS:
-6941 -6942  6943 -552  6944 0
-6941 -6942  6943 -552 -6945 0
-6941 -6942  6943 -552  6946 0

c  -1+1 --> 0
c    ( b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0 ∧  p_552) -> (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧ -b^{3, 185}_0)
c  in CNF:
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_2
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_1
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_0
c  in DIMACS:
-6941  6942 -6943 -552 -6944 0
-6941  6942 -6943 -552 -6945 0
-6941  6942 -6943 -552 -6946 0

c  0+1 --> 1
c    (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧  p_552) -> (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0)
c  in CNF:
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_2
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_1
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨  b^{3, 185}_0
c  in DIMACS:
 6941  6942  6943 -552 -6944 0
 6941  6942  6943 -552 -6945 0
 6941  6942  6943 -552  6946 0

c  1+1 --> 2
c    (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0 ∧  p_552) -> (-b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0)
c  in CNF:
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_2
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨  b^{3, 185}_1
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ -p_552 ∨ -b^{3, 185}_0
c  in DIMACS:
 6941  6942 -6943 -552 -6944 0
 6941  6942 -6943 -552  6945 0
 6941  6942 -6943 -552 -6946 0

c  2+1 --> break 
c    (-b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧  p_552) -> break
c  in CNF:
c     b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 6941 -6942  6943 -552 1162 0


c  2-1 --> 1
c    (-b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧ -p_552) -> (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0)
c  in CNF:
c     b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_2
c     b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_1
c     b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨  b^{3, 185}_0
c  in DIMACS:
 6941 -6942  6943  552 -6944 0
 6941 -6942  6943  552 -6945 0
 6941 -6942  6943  552  6946 0

c  1-1 --> 0
c    (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0 ∧ -p_552) -> (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧ -b^{3, 185}_0)
c  in CNF:
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_2
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_1
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_0
c  in DIMACS:
 6941  6942 -6943  552 -6944 0
 6941  6942 -6943  552 -6945 0
 6941  6942 -6943  552 -6946 0

c  0-1 --> -1
c    (-b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧ -p_552) -> ( b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0)
c  in CNF:
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨  b^{3, 185}_2
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_1
c     b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨  b^{3, 185}_0
c  in DIMACS:
 6941  6942  6943  552  6944 0
 6941  6942  6943  552 -6945 0
 6941  6942  6943  552  6946 0

c  -1-1 --> -2
c    ( b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧  b^{3, 184}_0 ∧ -p_552) -> ( b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0)
c  in CNF:
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨  b^{3, 185}_2
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨  b^{3, 185}_1
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨  p_552 ∨ -b^{3, 185}_0
c  in DIMACS:
-6941  6942 -6943  552  6944 0
-6941  6942 -6943  552  6945 0
-6941  6942 -6943  552 -6946 0

c  -2-1 --> break 
c    ( b^{3, 184}_2 ∧  b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨  b^{3, 184}_0 ∨  p_552 ∨ break
c  in DIMACS:
-6941 -6942  6943  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 184}_2 ∧ -b^{3, 184}_1 ∧ -b^{3, 184}_0 ∧ true) 
c  in CNF:
c    -b^{3, 184}_2 ∨  b^{3, 184}_1 ∨  b^{3, 184}_0 ∨ false 
c  in DIMACS:
-6941  6942  6943  0

c  3 does not represent an automaton state.
c    -(-b^{3, 184}_2 ∧  b^{3, 184}_1 ∧  b^{3, 184}_0 ∧ true) 
c  in CNF:
c     b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ false 
c  in DIMACS:
 6941 -6942 -6943  0
c  -3 does not represent an automaton state.
c    -( b^{3, 184}_2 ∧  b^{3, 184}_1 ∧  b^{3, 184}_0 ∧ true) 
c  in CNF:
c    -b^{3, 184}_2 ∨ -b^{3, 184}_1 ∨ -b^{3, 184}_0 ∨ false 
c  in DIMACS:
-6941 -6942 -6943  0

c i = 185
c  -2+1 --> -1
c    ( b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧  p_555) -> ( b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0)
c  in CNF:
c    -b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨  b^{3, 186}_2
c    -b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_1
c    -b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨  b^{3, 186}_0
c  in DIMACS:
-6944 -6945  6946 -555  6947 0
-6944 -6945  6946 -555 -6948 0
-6944 -6945  6946 -555  6949 0

c  -1+1 --> 0
c    ( b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0 ∧  p_555) -> (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧ -b^{3, 186}_0)
c  in CNF:
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_2
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_1
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_0
c  in DIMACS:
-6944  6945 -6946 -555 -6947 0
-6944  6945 -6946 -555 -6948 0
-6944  6945 -6946 -555 -6949 0

c  0+1 --> 1
c    (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧  p_555) -> (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0)
c  in CNF:
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_2
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_1
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨  b^{3, 186}_0
c  in DIMACS:
 6944  6945  6946 -555 -6947 0
 6944  6945  6946 -555 -6948 0
 6944  6945  6946 -555  6949 0

c  1+1 --> 2
c    (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0 ∧  p_555) -> (-b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0)
c  in CNF:
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_2
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨  b^{3, 186}_1
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ -p_555 ∨ -b^{3, 186}_0
c  in DIMACS:
 6944  6945 -6946 -555 -6947 0
 6944  6945 -6946 -555  6948 0
 6944  6945 -6946 -555 -6949 0

c  2+1 --> break 
c    (-b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧  p_555) -> break
c  in CNF:
c     b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 6944 -6945  6946 -555 1162 0


c  2-1 --> 1
c    (-b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧ -p_555) -> (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0)
c  in CNF:
c     b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_2
c     b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_1
c     b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨  b^{3, 186}_0
c  in DIMACS:
 6944 -6945  6946  555 -6947 0
 6944 -6945  6946  555 -6948 0
 6944 -6945  6946  555  6949 0

c  1-1 --> 0
c    (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0 ∧ -p_555) -> (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧ -b^{3, 186}_0)
c  in CNF:
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_2
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_1
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_0
c  in DIMACS:
 6944  6945 -6946  555 -6947 0
 6944  6945 -6946  555 -6948 0
 6944  6945 -6946  555 -6949 0

c  0-1 --> -1
c    (-b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧ -p_555) -> ( b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0)
c  in CNF:
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨  b^{3, 186}_2
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_1
c     b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨  b^{3, 186}_0
c  in DIMACS:
 6944  6945  6946  555  6947 0
 6944  6945  6946  555 -6948 0
 6944  6945  6946  555  6949 0

c  -1-1 --> -2
c    ( b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧  b^{3, 185}_0 ∧ -p_555) -> ( b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0)
c  in CNF:
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨  b^{3, 186}_2
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨  b^{3, 186}_1
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨  p_555 ∨ -b^{3, 186}_0
c  in DIMACS:
-6944  6945 -6946  555  6947 0
-6944  6945 -6946  555  6948 0
-6944  6945 -6946  555 -6949 0

c  -2-1 --> break 
c    ( b^{3, 185}_2 ∧  b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨  b^{3, 185}_0 ∨  p_555 ∨ break
c  in DIMACS:
-6944 -6945  6946  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 185}_2 ∧ -b^{3, 185}_1 ∧ -b^{3, 185}_0 ∧ true) 
c  in CNF:
c    -b^{3, 185}_2 ∨  b^{3, 185}_1 ∨  b^{3, 185}_0 ∨ false 
c  in DIMACS:
-6944  6945  6946  0

c  3 does not represent an automaton state.
c    -(-b^{3, 185}_2 ∧  b^{3, 185}_1 ∧  b^{3, 185}_0 ∧ true) 
c  in CNF:
c     b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ false 
c  in DIMACS:
 6944 -6945 -6946  0
c  -3 does not represent an automaton state.
c    -( b^{3, 185}_2 ∧  b^{3, 185}_1 ∧  b^{3, 185}_0 ∧ true) 
c  in CNF:
c    -b^{3, 185}_2 ∨ -b^{3, 185}_1 ∨ -b^{3, 185}_0 ∨ false 
c  in DIMACS:
-6944 -6945 -6946  0

c i = 186
c  -2+1 --> -1
c    ( b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧  p_558) -> ( b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0)
c  in CNF:
c    -b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨  b^{3, 187}_2
c    -b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_1
c    -b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨  b^{3, 187}_0
c  in DIMACS:
-6947 -6948  6949 -558  6950 0
-6947 -6948  6949 -558 -6951 0
-6947 -6948  6949 -558  6952 0

c  -1+1 --> 0
c    ( b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0 ∧  p_558) -> (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧ -b^{3, 187}_0)
c  in CNF:
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_2
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_1
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_0
c  in DIMACS:
-6947  6948 -6949 -558 -6950 0
-6947  6948 -6949 -558 -6951 0
-6947  6948 -6949 -558 -6952 0

c  0+1 --> 1
c    (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧  p_558) -> (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0)
c  in CNF:
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_2
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_1
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨  b^{3, 187}_0
c  in DIMACS:
 6947  6948  6949 -558 -6950 0
 6947  6948  6949 -558 -6951 0
 6947  6948  6949 -558  6952 0

c  1+1 --> 2
c    (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0 ∧  p_558) -> (-b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0)
c  in CNF:
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_2
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨  b^{3, 187}_1
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ -p_558 ∨ -b^{3, 187}_0
c  in DIMACS:
 6947  6948 -6949 -558 -6950 0
 6947  6948 -6949 -558  6951 0
 6947  6948 -6949 -558 -6952 0

c  2+1 --> break 
c    (-b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧  p_558) -> break
c  in CNF:
c     b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 6947 -6948  6949 -558 1162 0


c  2-1 --> 1
c    (-b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧ -p_558) -> (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0)
c  in CNF:
c     b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_2
c     b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_1
c     b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨  b^{3, 187}_0
c  in DIMACS:
 6947 -6948  6949  558 -6950 0
 6947 -6948  6949  558 -6951 0
 6947 -6948  6949  558  6952 0

c  1-1 --> 0
c    (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0 ∧ -p_558) -> (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧ -b^{3, 187}_0)
c  in CNF:
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_2
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_1
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_0
c  in DIMACS:
 6947  6948 -6949  558 -6950 0
 6947  6948 -6949  558 -6951 0
 6947  6948 -6949  558 -6952 0

c  0-1 --> -1
c    (-b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧ -p_558) -> ( b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0)
c  in CNF:
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨  b^{3, 187}_2
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_1
c     b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨  b^{3, 187}_0
c  in DIMACS:
 6947  6948  6949  558  6950 0
 6947  6948  6949  558 -6951 0
 6947  6948  6949  558  6952 0

c  -1-1 --> -2
c    ( b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧  b^{3, 186}_0 ∧ -p_558) -> ( b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0)
c  in CNF:
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨  b^{3, 187}_2
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨  b^{3, 187}_1
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨  p_558 ∨ -b^{3, 187}_0
c  in DIMACS:
-6947  6948 -6949  558  6950 0
-6947  6948 -6949  558  6951 0
-6947  6948 -6949  558 -6952 0

c  -2-1 --> break 
c    ( b^{3, 186}_2 ∧  b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨  b^{3, 186}_0 ∨  p_558 ∨ break
c  in DIMACS:
-6947 -6948  6949  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 186}_2 ∧ -b^{3, 186}_1 ∧ -b^{3, 186}_0 ∧ true) 
c  in CNF:
c    -b^{3, 186}_2 ∨  b^{3, 186}_1 ∨  b^{3, 186}_0 ∨ false 
c  in DIMACS:
-6947  6948  6949  0

c  3 does not represent an automaton state.
c    -(-b^{3, 186}_2 ∧  b^{3, 186}_1 ∧  b^{3, 186}_0 ∧ true) 
c  in CNF:
c     b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ false 
c  in DIMACS:
 6947 -6948 -6949  0
c  -3 does not represent an automaton state.
c    -( b^{3, 186}_2 ∧  b^{3, 186}_1 ∧  b^{3, 186}_0 ∧ true) 
c  in CNF:
c    -b^{3, 186}_2 ∨ -b^{3, 186}_1 ∨ -b^{3, 186}_0 ∨ false 
c  in DIMACS:
-6947 -6948 -6949  0

c i = 187
c  -2+1 --> -1
c    ( b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧  p_561) -> ( b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0)
c  in CNF:
c    -b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨  b^{3, 188}_2
c    -b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_1
c    -b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨  b^{3, 188}_0
c  in DIMACS:
-6950 -6951  6952 -561  6953 0
-6950 -6951  6952 -561 -6954 0
-6950 -6951  6952 -561  6955 0

c  -1+1 --> 0
c    ( b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0 ∧  p_561) -> (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧ -b^{3, 188}_0)
c  in CNF:
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_2
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_1
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_0
c  in DIMACS:
-6950  6951 -6952 -561 -6953 0
-6950  6951 -6952 -561 -6954 0
-6950  6951 -6952 -561 -6955 0

c  0+1 --> 1
c    (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧  p_561) -> (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0)
c  in CNF:
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_2
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_1
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨  b^{3, 188}_0
c  in DIMACS:
 6950  6951  6952 -561 -6953 0
 6950  6951  6952 -561 -6954 0
 6950  6951  6952 -561  6955 0

c  1+1 --> 2
c    (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0 ∧  p_561) -> (-b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0)
c  in CNF:
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_2
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨  b^{3, 188}_1
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ -p_561 ∨ -b^{3, 188}_0
c  in DIMACS:
 6950  6951 -6952 -561 -6953 0
 6950  6951 -6952 -561  6954 0
 6950  6951 -6952 -561 -6955 0

c  2+1 --> break 
c    (-b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧  p_561) -> break
c  in CNF:
c     b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 6950 -6951  6952 -561 1162 0


c  2-1 --> 1
c    (-b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧ -p_561) -> (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0)
c  in CNF:
c     b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_2
c     b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_1
c     b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨  b^{3, 188}_0
c  in DIMACS:
 6950 -6951  6952  561 -6953 0
 6950 -6951  6952  561 -6954 0
 6950 -6951  6952  561  6955 0

c  1-1 --> 0
c    (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0 ∧ -p_561) -> (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧ -b^{3, 188}_0)
c  in CNF:
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_2
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_1
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_0
c  in DIMACS:
 6950  6951 -6952  561 -6953 0
 6950  6951 -6952  561 -6954 0
 6950  6951 -6952  561 -6955 0

c  0-1 --> -1
c    (-b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧ -p_561) -> ( b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0)
c  in CNF:
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨  b^{3, 188}_2
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_1
c     b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨  b^{3, 188}_0
c  in DIMACS:
 6950  6951  6952  561  6953 0
 6950  6951  6952  561 -6954 0
 6950  6951  6952  561  6955 0

c  -1-1 --> -2
c    ( b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧  b^{3, 187}_0 ∧ -p_561) -> ( b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0)
c  in CNF:
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨  b^{3, 188}_2
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨  b^{3, 188}_1
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨  p_561 ∨ -b^{3, 188}_0
c  in DIMACS:
-6950  6951 -6952  561  6953 0
-6950  6951 -6952  561  6954 0
-6950  6951 -6952  561 -6955 0

c  -2-1 --> break 
c    ( b^{3, 187}_2 ∧  b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨  b^{3, 187}_0 ∨  p_561 ∨ break
c  in DIMACS:
-6950 -6951  6952  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 187}_2 ∧ -b^{3, 187}_1 ∧ -b^{3, 187}_0 ∧ true) 
c  in CNF:
c    -b^{3, 187}_2 ∨  b^{3, 187}_1 ∨  b^{3, 187}_0 ∨ false 
c  in DIMACS:
-6950  6951  6952  0

c  3 does not represent an automaton state.
c    -(-b^{3, 187}_2 ∧  b^{3, 187}_1 ∧  b^{3, 187}_0 ∧ true) 
c  in CNF:
c     b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ false 
c  in DIMACS:
 6950 -6951 -6952  0
c  -3 does not represent an automaton state.
c    -( b^{3, 187}_2 ∧  b^{3, 187}_1 ∧  b^{3, 187}_0 ∧ true) 
c  in CNF:
c    -b^{3, 187}_2 ∨ -b^{3, 187}_1 ∨ -b^{3, 187}_0 ∨ false 
c  in DIMACS:
-6950 -6951 -6952  0

c i = 188
c  -2+1 --> -1
c    ( b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧  p_564) -> ( b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0)
c  in CNF:
c    -b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨  b^{3, 189}_2
c    -b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_1
c    -b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨  b^{3, 189}_0
c  in DIMACS:
-6953 -6954  6955 -564  6956 0
-6953 -6954  6955 -564 -6957 0
-6953 -6954  6955 -564  6958 0

c  -1+1 --> 0
c    ( b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0 ∧  p_564) -> (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧ -b^{3, 189}_0)
c  in CNF:
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_2
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_1
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_0
c  in DIMACS:
-6953  6954 -6955 -564 -6956 0
-6953  6954 -6955 -564 -6957 0
-6953  6954 -6955 -564 -6958 0

c  0+1 --> 1
c    (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧  p_564) -> (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0)
c  in CNF:
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_2
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_1
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨  b^{3, 189}_0
c  in DIMACS:
 6953  6954  6955 -564 -6956 0
 6953  6954  6955 -564 -6957 0
 6953  6954  6955 -564  6958 0

c  1+1 --> 2
c    (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0 ∧  p_564) -> (-b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0)
c  in CNF:
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_2
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨  b^{3, 189}_1
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ -p_564 ∨ -b^{3, 189}_0
c  in DIMACS:
 6953  6954 -6955 -564 -6956 0
 6953  6954 -6955 -564  6957 0
 6953  6954 -6955 -564 -6958 0

c  2+1 --> break 
c    (-b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧  p_564) -> break
c  in CNF:
c     b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 6953 -6954  6955 -564 1162 0


c  2-1 --> 1
c    (-b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧ -p_564) -> (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0)
c  in CNF:
c     b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_2
c     b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_1
c     b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨  b^{3, 189}_0
c  in DIMACS:
 6953 -6954  6955  564 -6956 0
 6953 -6954  6955  564 -6957 0
 6953 -6954  6955  564  6958 0

c  1-1 --> 0
c    (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0 ∧ -p_564) -> (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧ -b^{3, 189}_0)
c  in CNF:
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_2
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_1
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_0
c  in DIMACS:
 6953  6954 -6955  564 -6956 0
 6953  6954 -6955  564 -6957 0
 6953  6954 -6955  564 -6958 0

c  0-1 --> -1
c    (-b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧ -p_564) -> ( b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0)
c  in CNF:
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨  b^{3, 189}_2
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_1
c     b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨  b^{3, 189}_0
c  in DIMACS:
 6953  6954  6955  564  6956 0
 6953  6954  6955  564 -6957 0
 6953  6954  6955  564  6958 0

c  -1-1 --> -2
c    ( b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧  b^{3, 188}_0 ∧ -p_564) -> ( b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0)
c  in CNF:
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨  b^{3, 189}_2
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨  b^{3, 189}_1
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨  p_564 ∨ -b^{3, 189}_0
c  in DIMACS:
-6953  6954 -6955  564  6956 0
-6953  6954 -6955  564  6957 0
-6953  6954 -6955  564 -6958 0

c  -2-1 --> break 
c    ( b^{3, 188}_2 ∧  b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨  b^{3, 188}_0 ∨  p_564 ∨ break
c  in DIMACS:
-6953 -6954  6955  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 188}_2 ∧ -b^{3, 188}_1 ∧ -b^{3, 188}_0 ∧ true) 
c  in CNF:
c    -b^{3, 188}_2 ∨  b^{3, 188}_1 ∨  b^{3, 188}_0 ∨ false 
c  in DIMACS:
-6953  6954  6955  0

c  3 does not represent an automaton state.
c    -(-b^{3, 188}_2 ∧  b^{3, 188}_1 ∧  b^{3, 188}_0 ∧ true) 
c  in CNF:
c     b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ false 
c  in DIMACS:
 6953 -6954 -6955  0
c  -3 does not represent an automaton state.
c    -( b^{3, 188}_2 ∧  b^{3, 188}_1 ∧  b^{3, 188}_0 ∧ true) 
c  in CNF:
c    -b^{3, 188}_2 ∨ -b^{3, 188}_1 ∨ -b^{3, 188}_0 ∨ false 
c  in DIMACS:
-6953 -6954 -6955  0

c i = 189
c  -2+1 --> -1
c    ( b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧  p_567) -> ( b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0)
c  in CNF:
c    -b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨  b^{3, 190}_2
c    -b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_1
c    -b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨  b^{3, 190}_0
c  in DIMACS:
-6956 -6957  6958 -567  6959 0
-6956 -6957  6958 -567 -6960 0
-6956 -6957  6958 -567  6961 0

c  -1+1 --> 0
c    ( b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0 ∧  p_567) -> (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧ -b^{3, 190}_0)
c  in CNF:
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_2
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_1
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_0
c  in DIMACS:
-6956  6957 -6958 -567 -6959 0
-6956  6957 -6958 -567 -6960 0
-6956  6957 -6958 -567 -6961 0

c  0+1 --> 1
c    (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧  p_567) -> (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0)
c  in CNF:
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_2
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_1
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨  b^{3, 190}_0
c  in DIMACS:
 6956  6957  6958 -567 -6959 0
 6956  6957  6958 -567 -6960 0
 6956  6957  6958 -567  6961 0

c  1+1 --> 2
c    (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0 ∧  p_567) -> (-b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0)
c  in CNF:
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_2
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨  b^{3, 190}_1
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ -p_567 ∨ -b^{3, 190}_0
c  in DIMACS:
 6956  6957 -6958 -567 -6959 0
 6956  6957 -6958 -567  6960 0
 6956  6957 -6958 -567 -6961 0

c  2+1 --> break 
c    (-b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧  p_567) -> break
c  in CNF:
c     b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 6956 -6957  6958 -567 1162 0


c  2-1 --> 1
c    (-b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧ -p_567) -> (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0)
c  in CNF:
c     b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_2
c     b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_1
c     b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨  b^{3, 190}_0
c  in DIMACS:
 6956 -6957  6958  567 -6959 0
 6956 -6957  6958  567 -6960 0
 6956 -6957  6958  567  6961 0

c  1-1 --> 0
c    (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0 ∧ -p_567) -> (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧ -b^{3, 190}_0)
c  in CNF:
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_2
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_1
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_0
c  in DIMACS:
 6956  6957 -6958  567 -6959 0
 6956  6957 -6958  567 -6960 0
 6956  6957 -6958  567 -6961 0

c  0-1 --> -1
c    (-b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧ -p_567) -> ( b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0)
c  in CNF:
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨  b^{3, 190}_2
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_1
c     b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨  b^{3, 190}_0
c  in DIMACS:
 6956  6957  6958  567  6959 0
 6956  6957  6958  567 -6960 0
 6956  6957  6958  567  6961 0

c  -1-1 --> -2
c    ( b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧  b^{3, 189}_0 ∧ -p_567) -> ( b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0)
c  in CNF:
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨  b^{3, 190}_2
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨  b^{3, 190}_1
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨  p_567 ∨ -b^{3, 190}_0
c  in DIMACS:
-6956  6957 -6958  567  6959 0
-6956  6957 -6958  567  6960 0
-6956  6957 -6958  567 -6961 0

c  -2-1 --> break 
c    ( b^{3, 189}_2 ∧  b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨  b^{3, 189}_0 ∨  p_567 ∨ break
c  in DIMACS:
-6956 -6957  6958  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 189}_2 ∧ -b^{3, 189}_1 ∧ -b^{3, 189}_0 ∧ true) 
c  in CNF:
c    -b^{3, 189}_2 ∨  b^{3, 189}_1 ∨  b^{3, 189}_0 ∨ false 
c  in DIMACS:
-6956  6957  6958  0

c  3 does not represent an automaton state.
c    -(-b^{3, 189}_2 ∧  b^{3, 189}_1 ∧  b^{3, 189}_0 ∧ true) 
c  in CNF:
c     b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ false 
c  in DIMACS:
 6956 -6957 -6958  0
c  -3 does not represent an automaton state.
c    -( b^{3, 189}_2 ∧  b^{3, 189}_1 ∧  b^{3, 189}_0 ∧ true) 
c  in CNF:
c    -b^{3, 189}_2 ∨ -b^{3, 189}_1 ∨ -b^{3, 189}_0 ∨ false 
c  in DIMACS:
-6956 -6957 -6958  0

c i = 190
c  -2+1 --> -1
c    ( b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧  p_570) -> ( b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0)
c  in CNF:
c    -b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨  b^{3, 191}_2
c    -b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_1
c    -b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨  b^{3, 191}_0
c  in DIMACS:
-6959 -6960  6961 -570  6962 0
-6959 -6960  6961 -570 -6963 0
-6959 -6960  6961 -570  6964 0

c  -1+1 --> 0
c    ( b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0 ∧  p_570) -> (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧ -b^{3, 191}_0)
c  in CNF:
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_2
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_1
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_0
c  in DIMACS:
-6959  6960 -6961 -570 -6962 0
-6959  6960 -6961 -570 -6963 0
-6959  6960 -6961 -570 -6964 0

c  0+1 --> 1
c    (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧  p_570) -> (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0)
c  in CNF:
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_2
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_1
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨  b^{3, 191}_0
c  in DIMACS:
 6959  6960  6961 -570 -6962 0
 6959  6960  6961 -570 -6963 0
 6959  6960  6961 -570  6964 0

c  1+1 --> 2
c    (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0 ∧  p_570) -> (-b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0)
c  in CNF:
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_2
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨  b^{3, 191}_1
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ -p_570 ∨ -b^{3, 191}_0
c  in DIMACS:
 6959  6960 -6961 -570 -6962 0
 6959  6960 -6961 -570  6963 0
 6959  6960 -6961 -570 -6964 0

c  2+1 --> break 
c    (-b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧  p_570) -> break
c  in CNF:
c     b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 6959 -6960  6961 -570 1162 0


c  2-1 --> 1
c    (-b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧ -p_570) -> (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0)
c  in CNF:
c     b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_2
c     b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_1
c     b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨  b^{3, 191}_0
c  in DIMACS:
 6959 -6960  6961  570 -6962 0
 6959 -6960  6961  570 -6963 0
 6959 -6960  6961  570  6964 0

c  1-1 --> 0
c    (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0 ∧ -p_570) -> (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧ -b^{3, 191}_0)
c  in CNF:
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_2
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_1
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_0
c  in DIMACS:
 6959  6960 -6961  570 -6962 0
 6959  6960 -6961  570 -6963 0
 6959  6960 -6961  570 -6964 0

c  0-1 --> -1
c    (-b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧ -p_570) -> ( b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0)
c  in CNF:
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨  b^{3, 191}_2
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_1
c     b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨  b^{3, 191}_0
c  in DIMACS:
 6959  6960  6961  570  6962 0
 6959  6960  6961  570 -6963 0
 6959  6960  6961  570  6964 0

c  -1-1 --> -2
c    ( b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧  b^{3, 190}_0 ∧ -p_570) -> ( b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0)
c  in CNF:
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨  b^{3, 191}_2
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨  b^{3, 191}_1
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨  p_570 ∨ -b^{3, 191}_0
c  in DIMACS:
-6959  6960 -6961  570  6962 0
-6959  6960 -6961  570  6963 0
-6959  6960 -6961  570 -6964 0

c  -2-1 --> break 
c    ( b^{3, 190}_2 ∧  b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨  b^{3, 190}_0 ∨  p_570 ∨ break
c  in DIMACS:
-6959 -6960  6961  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 190}_2 ∧ -b^{3, 190}_1 ∧ -b^{3, 190}_0 ∧ true) 
c  in CNF:
c    -b^{3, 190}_2 ∨  b^{3, 190}_1 ∨  b^{3, 190}_0 ∨ false 
c  in DIMACS:
-6959  6960  6961  0

c  3 does not represent an automaton state.
c    -(-b^{3, 190}_2 ∧  b^{3, 190}_1 ∧  b^{3, 190}_0 ∧ true) 
c  in CNF:
c     b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ false 
c  in DIMACS:
 6959 -6960 -6961  0
c  -3 does not represent an automaton state.
c    -( b^{3, 190}_2 ∧  b^{3, 190}_1 ∧  b^{3, 190}_0 ∧ true) 
c  in CNF:
c    -b^{3, 190}_2 ∨ -b^{3, 190}_1 ∨ -b^{3, 190}_0 ∨ false 
c  in DIMACS:
-6959 -6960 -6961  0

c i = 191
c  -2+1 --> -1
c    ( b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧  p_573) -> ( b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0)
c  in CNF:
c    -b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨  b^{3, 192}_2
c    -b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_1
c    -b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨  b^{3, 192}_0
c  in DIMACS:
-6962 -6963  6964 -573  6965 0
-6962 -6963  6964 -573 -6966 0
-6962 -6963  6964 -573  6967 0

c  -1+1 --> 0
c    ( b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0 ∧  p_573) -> (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧ -b^{3, 192}_0)
c  in CNF:
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_2
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_1
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_0
c  in DIMACS:
-6962  6963 -6964 -573 -6965 0
-6962  6963 -6964 -573 -6966 0
-6962  6963 -6964 -573 -6967 0

c  0+1 --> 1
c    (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧  p_573) -> (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0)
c  in CNF:
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_2
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_1
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨  b^{3, 192}_0
c  in DIMACS:
 6962  6963  6964 -573 -6965 0
 6962  6963  6964 -573 -6966 0
 6962  6963  6964 -573  6967 0

c  1+1 --> 2
c    (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0 ∧  p_573) -> (-b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0)
c  in CNF:
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_2
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨  b^{3, 192}_1
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ -p_573 ∨ -b^{3, 192}_0
c  in DIMACS:
 6962  6963 -6964 -573 -6965 0
 6962  6963 -6964 -573  6966 0
 6962  6963 -6964 -573 -6967 0

c  2+1 --> break 
c    (-b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧  p_573) -> break
c  in CNF:
c     b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ -p_573 ∨ break
c  in DIMACS:
 6962 -6963  6964 -573 1162 0


c  2-1 --> 1
c    (-b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧ -p_573) -> (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0)
c  in CNF:
c     b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_2
c     b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_1
c     b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨  b^{3, 192}_0
c  in DIMACS:
 6962 -6963  6964  573 -6965 0
 6962 -6963  6964  573 -6966 0
 6962 -6963  6964  573  6967 0

c  1-1 --> 0
c    (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0 ∧ -p_573) -> (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧ -b^{3, 192}_0)
c  in CNF:
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_2
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_1
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_0
c  in DIMACS:
 6962  6963 -6964  573 -6965 0
 6962  6963 -6964  573 -6966 0
 6962  6963 -6964  573 -6967 0

c  0-1 --> -1
c    (-b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧ -p_573) -> ( b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0)
c  in CNF:
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨  b^{3, 192}_2
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_1
c     b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨  b^{3, 192}_0
c  in DIMACS:
 6962  6963  6964  573  6965 0
 6962  6963  6964  573 -6966 0
 6962  6963  6964  573  6967 0

c  -1-1 --> -2
c    ( b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧  b^{3, 191}_0 ∧ -p_573) -> ( b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0)
c  in CNF:
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨  b^{3, 192}_2
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨  b^{3, 192}_1
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨  p_573 ∨ -b^{3, 192}_0
c  in DIMACS:
-6962  6963 -6964  573  6965 0
-6962  6963 -6964  573  6966 0
-6962  6963 -6964  573 -6967 0

c  -2-1 --> break 
c    ( b^{3, 191}_2 ∧  b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧ -p_573) -> break
c  in CNF:
c    -b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨  b^{3, 191}_0 ∨  p_573 ∨ break
c  in DIMACS:
-6962 -6963  6964  573 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 191}_2 ∧ -b^{3, 191}_1 ∧ -b^{3, 191}_0 ∧ true) 
c  in CNF:
c    -b^{3, 191}_2 ∨  b^{3, 191}_1 ∨  b^{3, 191}_0 ∨ false 
c  in DIMACS:
-6962  6963  6964  0

c  3 does not represent an automaton state.
c    -(-b^{3, 191}_2 ∧  b^{3, 191}_1 ∧  b^{3, 191}_0 ∧ true) 
c  in CNF:
c     b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ false 
c  in DIMACS:
 6962 -6963 -6964  0
c  -3 does not represent an automaton state.
c    -( b^{3, 191}_2 ∧  b^{3, 191}_1 ∧  b^{3, 191}_0 ∧ true) 
c  in CNF:
c    -b^{3, 191}_2 ∨ -b^{3, 191}_1 ∨ -b^{3, 191}_0 ∨ false 
c  in DIMACS:
-6962 -6963 -6964  0

c i = 192
c  -2+1 --> -1
c    ( b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧  p_576) -> ( b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0)
c  in CNF:
c    -b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨  b^{3, 193}_2
c    -b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_1
c    -b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨  b^{3, 193}_0
c  in DIMACS:
-6965 -6966  6967 -576  6968 0
-6965 -6966  6967 -576 -6969 0
-6965 -6966  6967 -576  6970 0

c  -1+1 --> 0
c    ( b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0 ∧  p_576) -> (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧ -b^{3, 193}_0)
c  in CNF:
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_2
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_1
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_0
c  in DIMACS:
-6965  6966 -6967 -576 -6968 0
-6965  6966 -6967 -576 -6969 0
-6965  6966 -6967 -576 -6970 0

c  0+1 --> 1
c    (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧  p_576) -> (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0)
c  in CNF:
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_2
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_1
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨  b^{3, 193}_0
c  in DIMACS:
 6965  6966  6967 -576 -6968 0
 6965  6966  6967 -576 -6969 0
 6965  6966  6967 -576  6970 0

c  1+1 --> 2
c    (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0 ∧  p_576) -> (-b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0)
c  in CNF:
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_2
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨  b^{3, 193}_1
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ -p_576 ∨ -b^{3, 193}_0
c  in DIMACS:
 6965  6966 -6967 -576 -6968 0
 6965  6966 -6967 -576  6969 0
 6965  6966 -6967 -576 -6970 0

c  2+1 --> break 
c    (-b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧  p_576) -> break
c  in CNF:
c     b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 6965 -6966  6967 -576 1162 0


c  2-1 --> 1
c    (-b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧ -p_576) -> (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0)
c  in CNF:
c     b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_2
c     b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_1
c     b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨  b^{3, 193}_0
c  in DIMACS:
 6965 -6966  6967  576 -6968 0
 6965 -6966  6967  576 -6969 0
 6965 -6966  6967  576  6970 0

c  1-1 --> 0
c    (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0 ∧ -p_576) -> (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧ -b^{3, 193}_0)
c  in CNF:
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_2
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_1
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_0
c  in DIMACS:
 6965  6966 -6967  576 -6968 0
 6965  6966 -6967  576 -6969 0
 6965  6966 -6967  576 -6970 0

c  0-1 --> -1
c    (-b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧ -p_576) -> ( b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0)
c  in CNF:
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨  b^{3, 193}_2
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_1
c     b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨  b^{3, 193}_0
c  in DIMACS:
 6965  6966  6967  576  6968 0
 6965  6966  6967  576 -6969 0
 6965  6966  6967  576  6970 0

c  -1-1 --> -2
c    ( b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧  b^{3, 192}_0 ∧ -p_576) -> ( b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0)
c  in CNF:
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨  b^{3, 193}_2
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨  b^{3, 193}_1
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨  p_576 ∨ -b^{3, 193}_0
c  in DIMACS:
-6965  6966 -6967  576  6968 0
-6965  6966 -6967  576  6969 0
-6965  6966 -6967  576 -6970 0

c  -2-1 --> break 
c    ( b^{3, 192}_2 ∧  b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨  b^{3, 192}_0 ∨  p_576 ∨ break
c  in DIMACS:
-6965 -6966  6967  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 192}_2 ∧ -b^{3, 192}_1 ∧ -b^{3, 192}_0 ∧ true) 
c  in CNF:
c    -b^{3, 192}_2 ∨  b^{3, 192}_1 ∨  b^{3, 192}_0 ∨ false 
c  in DIMACS:
-6965  6966  6967  0

c  3 does not represent an automaton state.
c    -(-b^{3, 192}_2 ∧  b^{3, 192}_1 ∧  b^{3, 192}_0 ∧ true) 
c  in CNF:
c     b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ false 
c  in DIMACS:
 6965 -6966 -6967  0
c  -3 does not represent an automaton state.
c    -( b^{3, 192}_2 ∧  b^{3, 192}_1 ∧  b^{3, 192}_0 ∧ true) 
c  in CNF:
c    -b^{3, 192}_2 ∨ -b^{3, 192}_1 ∨ -b^{3, 192}_0 ∨ false 
c  in DIMACS:
-6965 -6966 -6967  0

c i = 193
c  -2+1 --> -1
c    ( b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧  p_579) -> ( b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0)
c  in CNF:
c    -b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨  b^{3, 194}_2
c    -b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_1
c    -b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨  b^{3, 194}_0
c  in DIMACS:
-6968 -6969  6970 -579  6971 0
-6968 -6969  6970 -579 -6972 0
-6968 -6969  6970 -579  6973 0

c  -1+1 --> 0
c    ( b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0 ∧  p_579) -> (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧ -b^{3, 194}_0)
c  in CNF:
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_2
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_1
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_0
c  in DIMACS:
-6968  6969 -6970 -579 -6971 0
-6968  6969 -6970 -579 -6972 0
-6968  6969 -6970 -579 -6973 0

c  0+1 --> 1
c    (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧  p_579) -> (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0)
c  in CNF:
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_2
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_1
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨  b^{3, 194}_0
c  in DIMACS:
 6968  6969  6970 -579 -6971 0
 6968  6969  6970 -579 -6972 0
 6968  6969  6970 -579  6973 0

c  1+1 --> 2
c    (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0 ∧  p_579) -> (-b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0)
c  in CNF:
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_2
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨  b^{3, 194}_1
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ -p_579 ∨ -b^{3, 194}_0
c  in DIMACS:
 6968  6969 -6970 -579 -6971 0
 6968  6969 -6970 -579  6972 0
 6968  6969 -6970 -579 -6973 0

c  2+1 --> break 
c    (-b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧  p_579) -> break
c  in CNF:
c     b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ -p_579 ∨ break
c  in DIMACS:
 6968 -6969  6970 -579 1162 0


c  2-1 --> 1
c    (-b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧ -p_579) -> (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0)
c  in CNF:
c     b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_2
c     b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_1
c     b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨  b^{3, 194}_0
c  in DIMACS:
 6968 -6969  6970  579 -6971 0
 6968 -6969  6970  579 -6972 0
 6968 -6969  6970  579  6973 0

c  1-1 --> 0
c    (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0 ∧ -p_579) -> (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧ -b^{3, 194}_0)
c  in CNF:
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_2
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_1
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_0
c  in DIMACS:
 6968  6969 -6970  579 -6971 0
 6968  6969 -6970  579 -6972 0
 6968  6969 -6970  579 -6973 0

c  0-1 --> -1
c    (-b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧ -p_579) -> ( b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0)
c  in CNF:
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨  b^{3, 194}_2
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_1
c     b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨  b^{3, 194}_0
c  in DIMACS:
 6968  6969  6970  579  6971 0
 6968  6969  6970  579 -6972 0
 6968  6969  6970  579  6973 0

c  -1-1 --> -2
c    ( b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧  b^{3, 193}_0 ∧ -p_579) -> ( b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0)
c  in CNF:
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨  b^{3, 194}_2
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨  b^{3, 194}_1
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨  p_579 ∨ -b^{3, 194}_0
c  in DIMACS:
-6968  6969 -6970  579  6971 0
-6968  6969 -6970  579  6972 0
-6968  6969 -6970  579 -6973 0

c  -2-1 --> break 
c    ( b^{3, 193}_2 ∧  b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧ -p_579) -> break
c  in CNF:
c    -b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨  b^{3, 193}_0 ∨  p_579 ∨ break
c  in DIMACS:
-6968 -6969  6970  579 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 193}_2 ∧ -b^{3, 193}_1 ∧ -b^{3, 193}_0 ∧ true) 
c  in CNF:
c    -b^{3, 193}_2 ∨  b^{3, 193}_1 ∨  b^{3, 193}_0 ∨ false 
c  in DIMACS:
-6968  6969  6970  0

c  3 does not represent an automaton state.
c    -(-b^{3, 193}_2 ∧  b^{3, 193}_1 ∧  b^{3, 193}_0 ∧ true) 
c  in CNF:
c     b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ false 
c  in DIMACS:
 6968 -6969 -6970  0
c  -3 does not represent an automaton state.
c    -( b^{3, 193}_2 ∧  b^{3, 193}_1 ∧  b^{3, 193}_0 ∧ true) 
c  in CNF:
c    -b^{3, 193}_2 ∨ -b^{3, 193}_1 ∨ -b^{3, 193}_0 ∨ false 
c  in DIMACS:
-6968 -6969 -6970  0

c i = 194
c  -2+1 --> -1
c    ( b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧  p_582) -> ( b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0)
c  in CNF:
c    -b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨  b^{3, 195}_2
c    -b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_1
c    -b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨  b^{3, 195}_0
c  in DIMACS:
-6971 -6972  6973 -582  6974 0
-6971 -6972  6973 -582 -6975 0
-6971 -6972  6973 -582  6976 0

c  -1+1 --> 0
c    ( b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0 ∧  p_582) -> (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧ -b^{3, 195}_0)
c  in CNF:
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_2
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_1
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_0
c  in DIMACS:
-6971  6972 -6973 -582 -6974 0
-6971  6972 -6973 -582 -6975 0
-6971  6972 -6973 -582 -6976 0

c  0+1 --> 1
c    (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧  p_582) -> (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0)
c  in CNF:
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_2
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_1
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨  b^{3, 195}_0
c  in DIMACS:
 6971  6972  6973 -582 -6974 0
 6971  6972  6973 -582 -6975 0
 6971  6972  6973 -582  6976 0

c  1+1 --> 2
c    (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0 ∧  p_582) -> (-b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0)
c  in CNF:
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_2
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨  b^{3, 195}_1
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ -p_582 ∨ -b^{3, 195}_0
c  in DIMACS:
 6971  6972 -6973 -582 -6974 0
 6971  6972 -6973 -582  6975 0
 6971  6972 -6973 -582 -6976 0

c  2+1 --> break 
c    (-b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧  p_582) -> break
c  in CNF:
c     b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 6971 -6972  6973 -582 1162 0


c  2-1 --> 1
c    (-b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧ -p_582) -> (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0)
c  in CNF:
c     b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_2
c     b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_1
c     b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨  b^{3, 195}_0
c  in DIMACS:
 6971 -6972  6973  582 -6974 0
 6971 -6972  6973  582 -6975 0
 6971 -6972  6973  582  6976 0

c  1-1 --> 0
c    (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0 ∧ -p_582) -> (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧ -b^{3, 195}_0)
c  in CNF:
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_2
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_1
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_0
c  in DIMACS:
 6971  6972 -6973  582 -6974 0
 6971  6972 -6973  582 -6975 0
 6971  6972 -6973  582 -6976 0

c  0-1 --> -1
c    (-b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧ -p_582) -> ( b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0)
c  in CNF:
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨  b^{3, 195}_2
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_1
c     b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨  b^{3, 195}_0
c  in DIMACS:
 6971  6972  6973  582  6974 0
 6971  6972  6973  582 -6975 0
 6971  6972  6973  582  6976 0

c  -1-1 --> -2
c    ( b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧  b^{3, 194}_0 ∧ -p_582) -> ( b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0)
c  in CNF:
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨  b^{3, 195}_2
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨  b^{3, 195}_1
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨  p_582 ∨ -b^{3, 195}_0
c  in DIMACS:
-6971  6972 -6973  582  6974 0
-6971  6972 -6973  582  6975 0
-6971  6972 -6973  582 -6976 0

c  -2-1 --> break 
c    ( b^{3, 194}_2 ∧  b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨  b^{3, 194}_0 ∨  p_582 ∨ break
c  in DIMACS:
-6971 -6972  6973  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 194}_2 ∧ -b^{3, 194}_1 ∧ -b^{3, 194}_0 ∧ true) 
c  in CNF:
c    -b^{3, 194}_2 ∨  b^{3, 194}_1 ∨  b^{3, 194}_0 ∨ false 
c  in DIMACS:
-6971  6972  6973  0

c  3 does not represent an automaton state.
c    -(-b^{3, 194}_2 ∧  b^{3, 194}_1 ∧  b^{3, 194}_0 ∧ true) 
c  in CNF:
c     b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ false 
c  in DIMACS:
 6971 -6972 -6973  0
c  -3 does not represent an automaton state.
c    -( b^{3, 194}_2 ∧  b^{3, 194}_1 ∧  b^{3, 194}_0 ∧ true) 
c  in CNF:
c    -b^{3, 194}_2 ∨ -b^{3, 194}_1 ∨ -b^{3, 194}_0 ∨ false 
c  in DIMACS:
-6971 -6972 -6973  0

c i = 195
c  -2+1 --> -1
c    ( b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧  p_585) -> ( b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0)
c  in CNF:
c    -b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨  b^{3, 196}_2
c    -b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_1
c    -b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨  b^{3, 196}_0
c  in DIMACS:
-6974 -6975  6976 -585  6977 0
-6974 -6975  6976 -585 -6978 0
-6974 -6975  6976 -585  6979 0

c  -1+1 --> 0
c    ( b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0 ∧  p_585) -> (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧ -b^{3, 196}_0)
c  in CNF:
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_2
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_1
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_0
c  in DIMACS:
-6974  6975 -6976 -585 -6977 0
-6974  6975 -6976 -585 -6978 0
-6974  6975 -6976 -585 -6979 0

c  0+1 --> 1
c    (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧  p_585) -> (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0)
c  in CNF:
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_2
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_1
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨  b^{3, 196}_0
c  in DIMACS:
 6974  6975  6976 -585 -6977 0
 6974  6975  6976 -585 -6978 0
 6974  6975  6976 -585  6979 0

c  1+1 --> 2
c    (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0 ∧  p_585) -> (-b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0)
c  in CNF:
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_2
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨  b^{3, 196}_1
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ -p_585 ∨ -b^{3, 196}_0
c  in DIMACS:
 6974  6975 -6976 -585 -6977 0
 6974  6975 -6976 -585  6978 0
 6974  6975 -6976 -585 -6979 0

c  2+1 --> break 
c    (-b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧  p_585) -> break
c  in CNF:
c     b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 6974 -6975  6976 -585 1162 0


c  2-1 --> 1
c    (-b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧ -p_585) -> (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0)
c  in CNF:
c     b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_2
c     b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_1
c     b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨  b^{3, 196}_0
c  in DIMACS:
 6974 -6975  6976  585 -6977 0
 6974 -6975  6976  585 -6978 0
 6974 -6975  6976  585  6979 0

c  1-1 --> 0
c    (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0 ∧ -p_585) -> (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧ -b^{3, 196}_0)
c  in CNF:
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_2
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_1
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_0
c  in DIMACS:
 6974  6975 -6976  585 -6977 0
 6974  6975 -6976  585 -6978 0
 6974  6975 -6976  585 -6979 0

c  0-1 --> -1
c    (-b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧ -p_585) -> ( b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0)
c  in CNF:
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨  b^{3, 196}_2
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_1
c     b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨  b^{3, 196}_0
c  in DIMACS:
 6974  6975  6976  585  6977 0
 6974  6975  6976  585 -6978 0
 6974  6975  6976  585  6979 0

c  -1-1 --> -2
c    ( b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧  b^{3, 195}_0 ∧ -p_585) -> ( b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0)
c  in CNF:
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨  b^{3, 196}_2
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨  b^{3, 196}_1
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨  p_585 ∨ -b^{3, 196}_0
c  in DIMACS:
-6974  6975 -6976  585  6977 0
-6974  6975 -6976  585  6978 0
-6974  6975 -6976  585 -6979 0

c  -2-1 --> break 
c    ( b^{3, 195}_2 ∧  b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨  b^{3, 195}_0 ∨  p_585 ∨ break
c  in DIMACS:
-6974 -6975  6976  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 195}_2 ∧ -b^{3, 195}_1 ∧ -b^{3, 195}_0 ∧ true) 
c  in CNF:
c    -b^{3, 195}_2 ∨  b^{3, 195}_1 ∨  b^{3, 195}_0 ∨ false 
c  in DIMACS:
-6974  6975  6976  0

c  3 does not represent an automaton state.
c    -(-b^{3, 195}_2 ∧  b^{3, 195}_1 ∧  b^{3, 195}_0 ∧ true) 
c  in CNF:
c     b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ false 
c  in DIMACS:
 6974 -6975 -6976  0
c  -3 does not represent an automaton state.
c    -( b^{3, 195}_2 ∧  b^{3, 195}_1 ∧  b^{3, 195}_0 ∧ true) 
c  in CNF:
c    -b^{3, 195}_2 ∨ -b^{3, 195}_1 ∨ -b^{3, 195}_0 ∨ false 
c  in DIMACS:
-6974 -6975 -6976  0

c i = 196
c  -2+1 --> -1
c    ( b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧  p_588) -> ( b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0)
c  in CNF:
c    -b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨  b^{3, 197}_2
c    -b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_1
c    -b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨  b^{3, 197}_0
c  in DIMACS:
-6977 -6978  6979 -588  6980 0
-6977 -6978  6979 -588 -6981 0
-6977 -6978  6979 -588  6982 0

c  -1+1 --> 0
c    ( b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0 ∧  p_588) -> (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧ -b^{3, 197}_0)
c  in CNF:
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_2
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_1
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_0
c  in DIMACS:
-6977  6978 -6979 -588 -6980 0
-6977  6978 -6979 -588 -6981 0
-6977  6978 -6979 -588 -6982 0

c  0+1 --> 1
c    (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧  p_588) -> (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0)
c  in CNF:
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_2
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_1
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨  b^{3, 197}_0
c  in DIMACS:
 6977  6978  6979 -588 -6980 0
 6977  6978  6979 -588 -6981 0
 6977  6978  6979 -588  6982 0

c  1+1 --> 2
c    (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0 ∧  p_588) -> (-b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0)
c  in CNF:
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_2
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨  b^{3, 197}_1
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ -p_588 ∨ -b^{3, 197}_0
c  in DIMACS:
 6977  6978 -6979 -588 -6980 0
 6977  6978 -6979 -588  6981 0
 6977  6978 -6979 -588 -6982 0

c  2+1 --> break 
c    (-b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧  p_588) -> break
c  in CNF:
c     b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 6977 -6978  6979 -588 1162 0


c  2-1 --> 1
c    (-b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧ -p_588) -> (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0)
c  in CNF:
c     b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_2
c     b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_1
c     b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨  b^{3, 197}_0
c  in DIMACS:
 6977 -6978  6979  588 -6980 0
 6977 -6978  6979  588 -6981 0
 6977 -6978  6979  588  6982 0

c  1-1 --> 0
c    (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0 ∧ -p_588) -> (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧ -b^{3, 197}_0)
c  in CNF:
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_2
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_1
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_0
c  in DIMACS:
 6977  6978 -6979  588 -6980 0
 6977  6978 -6979  588 -6981 0
 6977  6978 -6979  588 -6982 0

c  0-1 --> -1
c    (-b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧ -p_588) -> ( b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0)
c  in CNF:
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨  b^{3, 197}_2
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_1
c     b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨  b^{3, 197}_0
c  in DIMACS:
 6977  6978  6979  588  6980 0
 6977  6978  6979  588 -6981 0
 6977  6978  6979  588  6982 0

c  -1-1 --> -2
c    ( b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧  b^{3, 196}_0 ∧ -p_588) -> ( b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0)
c  in CNF:
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨  b^{3, 197}_2
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨  b^{3, 197}_1
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨  p_588 ∨ -b^{3, 197}_0
c  in DIMACS:
-6977  6978 -6979  588  6980 0
-6977  6978 -6979  588  6981 0
-6977  6978 -6979  588 -6982 0

c  -2-1 --> break 
c    ( b^{3, 196}_2 ∧  b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨  b^{3, 196}_0 ∨  p_588 ∨ break
c  in DIMACS:
-6977 -6978  6979  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 196}_2 ∧ -b^{3, 196}_1 ∧ -b^{3, 196}_0 ∧ true) 
c  in CNF:
c    -b^{3, 196}_2 ∨  b^{3, 196}_1 ∨  b^{3, 196}_0 ∨ false 
c  in DIMACS:
-6977  6978  6979  0

c  3 does not represent an automaton state.
c    -(-b^{3, 196}_2 ∧  b^{3, 196}_1 ∧  b^{3, 196}_0 ∧ true) 
c  in CNF:
c     b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ false 
c  in DIMACS:
 6977 -6978 -6979  0
c  -3 does not represent an automaton state.
c    -( b^{3, 196}_2 ∧  b^{3, 196}_1 ∧  b^{3, 196}_0 ∧ true) 
c  in CNF:
c    -b^{3, 196}_2 ∨ -b^{3, 196}_1 ∨ -b^{3, 196}_0 ∨ false 
c  in DIMACS:
-6977 -6978 -6979  0

c i = 197
c  -2+1 --> -1
c    ( b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧  p_591) -> ( b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0)
c  in CNF:
c    -b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨  b^{3, 198}_2
c    -b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_1
c    -b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨  b^{3, 198}_0
c  in DIMACS:
-6980 -6981  6982 -591  6983 0
-6980 -6981  6982 -591 -6984 0
-6980 -6981  6982 -591  6985 0

c  -1+1 --> 0
c    ( b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0 ∧  p_591) -> (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧ -b^{3, 198}_0)
c  in CNF:
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_2
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_1
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_0
c  in DIMACS:
-6980  6981 -6982 -591 -6983 0
-6980  6981 -6982 -591 -6984 0
-6980  6981 -6982 -591 -6985 0

c  0+1 --> 1
c    (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧  p_591) -> (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0)
c  in CNF:
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_2
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_1
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨  b^{3, 198}_0
c  in DIMACS:
 6980  6981  6982 -591 -6983 0
 6980  6981  6982 -591 -6984 0
 6980  6981  6982 -591  6985 0

c  1+1 --> 2
c    (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0 ∧  p_591) -> (-b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0)
c  in CNF:
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_2
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨  b^{3, 198}_1
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ -p_591 ∨ -b^{3, 198}_0
c  in DIMACS:
 6980  6981 -6982 -591 -6983 0
 6980  6981 -6982 -591  6984 0
 6980  6981 -6982 -591 -6985 0

c  2+1 --> break 
c    (-b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧  p_591) -> break
c  in CNF:
c     b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ -p_591 ∨ break
c  in DIMACS:
 6980 -6981  6982 -591 1162 0


c  2-1 --> 1
c    (-b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧ -p_591) -> (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0)
c  in CNF:
c     b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_2
c     b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_1
c     b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨  b^{3, 198}_0
c  in DIMACS:
 6980 -6981  6982  591 -6983 0
 6980 -6981  6982  591 -6984 0
 6980 -6981  6982  591  6985 0

c  1-1 --> 0
c    (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0 ∧ -p_591) -> (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧ -b^{3, 198}_0)
c  in CNF:
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_2
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_1
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_0
c  in DIMACS:
 6980  6981 -6982  591 -6983 0
 6980  6981 -6982  591 -6984 0
 6980  6981 -6982  591 -6985 0

c  0-1 --> -1
c    (-b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧ -p_591) -> ( b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0)
c  in CNF:
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨  b^{3, 198}_2
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_1
c     b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨  b^{3, 198}_0
c  in DIMACS:
 6980  6981  6982  591  6983 0
 6980  6981  6982  591 -6984 0
 6980  6981  6982  591  6985 0

c  -1-1 --> -2
c    ( b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧  b^{3, 197}_0 ∧ -p_591) -> ( b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0)
c  in CNF:
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨  b^{3, 198}_2
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨  b^{3, 198}_1
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨  p_591 ∨ -b^{3, 198}_0
c  in DIMACS:
-6980  6981 -6982  591  6983 0
-6980  6981 -6982  591  6984 0
-6980  6981 -6982  591 -6985 0

c  -2-1 --> break 
c    ( b^{3, 197}_2 ∧  b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧ -p_591) -> break
c  in CNF:
c    -b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨  b^{3, 197}_0 ∨  p_591 ∨ break
c  in DIMACS:
-6980 -6981  6982  591 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 197}_2 ∧ -b^{3, 197}_1 ∧ -b^{3, 197}_0 ∧ true) 
c  in CNF:
c    -b^{3, 197}_2 ∨  b^{3, 197}_1 ∨  b^{3, 197}_0 ∨ false 
c  in DIMACS:
-6980  6981  6982  0

c  3 does not represent an automaton state.
c    -(-b^{3, 197}_2 ∧  b^{3, 197}_1 ∧  b^{3, 197}_0 ∧ true) 
c  in CNF:
c     b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ false 
c  in DIMACS:
 6980 -6981 -6982  0
c  -3 does not represent an automaton state.
c    -( b^{3, 197}_2 ∧  b^{3, 197}_1 ∧  b^{3, 197}_0 ∧ true) 
c  in CNF:
c    -b^{3, 197}_2 ∨ -b^{3, 197}_1 ∨ -b^{3, 197}_0 ∨ false 
c  in DIMACS:
-6980 -6981 -6982  0

c i = 198
c  -2+1 --> -1
c    ( b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧  p_594) -> ( b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0)
c  in CNF:
c    -b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨  b^{3, 199}_2
c    -b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_1
c    -b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨  b^{3, 199}_0
c  in DIMACS:
-6983 -6984  6985 -594  6986 0
-6983 -6984  6985 -594 -6987 0
-6983 -6984  6985 -594  6988 0

c  -1+1 --> 0
c    ( b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0 ∧  p_594) -> (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧ -b^{3, 199}_0)
c  in CNF:
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_2
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_1
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_0
c  in DIMACS:
-6983  6984 -6985 -594 -6986 0
-6983  6984 -6985 -594 -6987 0
-6983  6984 -6985 -594 -6988 0

c  0+1 --> 1
c    (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧  p_594) -> (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0)
c  in CNF:
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_2
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_1
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨  b^{3, 199}_0
c  in DIMACS:
 6983  6984  6985 -594 -6986 0
 6983  6984  6985 -594 -6987 0
 6983  6984  6985 -594  6988 0

c  1+1 --> 2
c    (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0 ∧  p_594) -> (-b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0)
c  in CNF:
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_2
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨  b^{3, 199}_1
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ -p_594 ∨ -b^{3, 199}_0
c  in DIMACS:
 6983  6984 -6985 -594 -6986 0
 6983  6984 -6985 -594  6987 0
 6983  6984 -6985 -594 -6988 0

c  2+1 --> break 
c    (-b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧  p_594) -> break
c  in CNF:
c     b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 6983 -6984  6985 -594 1162 0


c  2-1 --> 1
c    (-b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧ -p_594) -> (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0)
c  in CNF:
c     b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_2
c     b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_1
c     b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨  b^{3, 199}_0
c  in DIMACS:
 6983 -6984  6985  594 -6986 0
 6983 -6984  6985  594 -6987 0
 6983 -6984  6985  594  6988 0

c  1-1 --> 0
c    (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0 ∧ -p_594) -> (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧ -b^{3, 199}_0)
c  in CNF:
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_2
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_1
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_0
c  in DIMACS:
 6983  6984 -6985  594 -6986 0
 6983  6984 -6985  594 -6987 0
 6983  6984 -6985  594 -6988 0

c  0-1 --> -1
c    (-b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧ -p_594) -> ( b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0)
c  in CNF:
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨  b^{3, 199}_2
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_1
c     b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨  b^{3, 199}_0
c  in DIMACS:
 6983  6984  6985  594  6986 0
 6983  6984  6985  594 -6987 0
 6983  6984  6985  594  6988 0

c  -1-1 --> -2
c    ( b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧  b^{3, 198}_0 ∧ -p_594) -> ( b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0)
c  in CNF:
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨  b^{3, 199}_2
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨  b^{3, 199}_1
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨  p_594 ∨ -b^{3, 199}_0
c  in DIMACS:
-6983  6984 -6985  594  6986 0
-6983  6984 -6985  594  6987 0
-6983  6984 -6985  594 -6988 0

c  -2-1 --> break 
c    ( b^{3, 198}_2 ∧  b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨  b^{3, 198}_0 ∨  p_594 ∨ break
c  in DIMACS:
-6983 -6984  6985  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 198}_2 ∧ -b^{3, 198}_1 ∧ -b^{3, 198}_0 ∧ true) 
c  in CNF:
c    -b^{3, 198}_2 ∨  b^{3, 198}_1 ∨  b^{3, 198}_0 ∨ false 
c  in DIMACS:
-6983  6984  6985  0

c  3 does not represent an automaton state.
c    -(-b^{3, 198}_2 ∧  b^{3, 198}_1 ∧  b^{3, 198}_0 ∧ true) 
c  in CNF:
c     b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ false 
c  in DIMACS:
 6983 -6984 -6985  0
c  -3 does not represent an automaton state.
c    -( b^{3, 198}_2 ∧  b^{3, 198}_1 ∧  b^{3, 198}_0 ∧ true) 
c  in CNF:
c    -b^{3, 198}_2 ∨ -b^{3, 198}_1 ∨ -b^{3, 198}_0 ∨ false 
c  in DIMACS:
-6983 -6984 -6985  0

c i = 199
c  -2+1 --> -1
c    ( b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧  p_597) -> ( b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0)
c  in CNF:
c    -b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨  b^{3, 200}_2
c    -b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_1
c    -b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨  b^{3, 200}_0
c  in DIMACS:
-6986 -6987  6988 -597  6989 0
-6986 -6987  6988 -597 -6990 0
-6986 -6987  6988 -597  6991 0

c  -1+1 --> 0
c    ( b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0 ∧  p_597) -> (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧ -b^{3, 200}_0)
c  in CNF:
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_2
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_1
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_0
c  in DIMACS:
-6986  6987 -6988 -597 -6989 0
-6986  6987 -6988 -597 -6990 0
-6986  6987 -6988 -597 -6991 0

c  0+1 --> 1
c    (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧  p_597) -> (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0)
c  in CNF:
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_2
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_1
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨  b^{3, 200}_0
c  in DIMACS:
 6986  6987  6988 -597 -6989 0
 6986  6987  6988 -597 -6990 0
 6986  6987  6988 -597  6991 0

c  1+1 --> 2
c    (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0 ∧  p_597) -> (-b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0)
c  in CNF:
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_2
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨  b^{3, 200}_1
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ -p_597 ∨ -b^{3, 200}_0
c  in DIMACS:
 6986  6987 -6988 -597 -6989 0
 6986  6987 -6988 -597  6990 0
 6986  6987 -6988 -597 -6991 0

c  2+1 --> break 
c    (-b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧  p_597) -> break
c  in CNF:
c     b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ -p_597 ∨ break
c  in DIMACS:
 6986 -6987  6988 -597 1162 0


c  2-1 --> 1
c    (-b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧ -p_597) -> (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0)
c  in CNF:
c     b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_2
c     b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_1
c     b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨  b^{3, 200}_0
c  in DIMACS:
 6986 -6987  6988  597 -6989 0
 6986 -6987  6988  597 -6990 0
 6986 -6987  6988  597  6991 0

c  1-1 --> 0
c    (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0 ∧ -p_597) -> (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧ -b^{3, 200}_0)
c  in CNF:
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_2
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_1
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_0
c  in DIMACS:
 6986  6987 -6988  597 -6989 0
 6986  6987 -6988  597 -6990 0
 6986  6987 -6988  597 -6991 0

c  0-1 --> -1
c    (-b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧ -p_597) -> ( b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0)
c  in CNF:
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨  b^{3, 200}_2
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_1
c     b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨  b^{3, 200}_0
c  in DIMACS:
 6986  6987  6988  597  6989 0
 6986  6987  6988  597 -6990 0
 6986  6987  6988  597  6991 0

c  -1-1 --> -2
c    ( b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧  b^{3, 199}_0 ∧ -p_597) -> ( b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0)
c  in CNF:
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨  b^{3, 200}_2
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨  b^{3, 200}_1
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨  p_597 ∨ -b^{3, 200}_0
c  in DIMACS:
-6986  6987 -6988  597  6989 0
-6986  6987 -6988  597  6990 0
-6986  6987 -6988  597 -6991 0

c  -2-1 --> break 
c    ( b^{3, 199}_2 ∧  b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧ -p_597) -> break
c  in CNF:
c    -b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨  b^{3, 199}_0 ∨  p_597 ∨ break
c  in DIMACS:
-6986 -6987  6988  597 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 199}_2 ∧ -b^{3, 199}_1 ∧ -b^{3, 199}_0 ∧ true) 
c  in CNF:
c    -b^{3, 199}_2 ∨  b^{3, 199}_1 ∨  b^{3, 199}_0 ∨ false 
c  in DIMACS:
-6986  6987  6988  0

c  3 does not represent an automaton state.
c    -(-b^{3, 199}_2 ∧  b^{3, 199}_1 ∧  b^{3, 199}_0 ∧ true) 
c  in CNF:
c     b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ false 
c  in DIMACS:
 6986 -6987 -6988  0
c  -3 does not represent an automaton state.
c    -( b^{3, 199}_2 ∧  b^{3, 199}_1 ∧  b^{3, 199}_0 ∧ true) 
c  in CNF:
c    -b^{3, 199}_2 ∨ -b^{3, 199}_1 ∨ -b^{3, 199}_0 ∨ false 
c  in DIMACS:
-6986 -6987 -6988  0

c i = 200
c  -2+1 --> -1
c    ( b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧  p_600) -> ( b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0)
c  in CNF:
c    -b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨  b^{3, 201}_2
c    -b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_1
c    -b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨  b^{3, 201}_0
c  in DIMACS:
-6989 -6990  6991 -600  6992 0
-6989 -6990  6991 -600 -6993 0
-6989 -6990  6991 -600  6994 0

c  -1+1 --> 0
c    ( b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0 ∧  p_600) -> (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧ -b^{3, 201}_0)
c  in CNF:
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_2
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_1
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_0
c  in DIMACS:
-6989  6990 -6991 -600 -6992 0
-6989  6990 -6991 -600 -6993 0
-6989  6990 -6991 -600 -6994 0

c  0+1 --> 1
c    (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧  p_600) -> (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0)
c  in CNF:
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_2
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_1
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨  b^{3, 201}_0
c  in DIMACS:
 6989  6990  6991 -600 -6992 0
 6989  6990  6991 -600 -6993 0
 6989  6990  6991 -600  6994 0

c  1+1 --> 2
c    (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0 ∧  p_600) -> (-b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0)
c  in CNF:
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_2
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨  b^{3, 201}_1
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ -p_600 ∨ -b^{3, 201}_0
c  in DIMACS:
 6989  6990 -6991 -600 -6992 0
 6989  6990 -6991 -600  6993 0
 6989  6990 -6991 -600 -6994 0

c  2+1 --> break 
c    (-b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧  p_600) -> break
c  in CNF:
c     b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 6989 -6990  6991 -600 1162 0


c  2-1 --> 1
c    (-b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧ -p_600) -> (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0)
c  in CNF:
c     b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_2
c     b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_1
c     b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨  b^{3, 201}_0
c  in DIMACS:
 6989 -6990  6991  600 -6992 0
 6989 -6990  6991  600 -6993 0
 6989 -6990  6991  600  6994 0

c  1-1 --> 0
c    (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0 ∧ -p_600) -> (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧ -b^{3, 201}_0)
c  in CNF:
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_2
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_1
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_0
c  in DIMACS:
 6989  6990 -6991  600 -6992 0
 6989  6990 -6991  600 -6993 0
 6989  6990 -6991  600 -6994 0

c  0-1 --> -1
c    (-b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧ -p_600) -> ( b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0)
c  in CNF:
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨  b^{3, 201}_2
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_1
c     b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨  b^{3, 201}_0
c  in DIMACS:
 6989  6990  6991  600  6992 0
 6989  6990  6991  600 -6993 0
 6989  6990  6991  600  6994 0

c  -1-1 --> -2
c    ( b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧  b^{3, 200}_0 ∧ -p_600) -> ( b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0)
c  in CNF:
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨  b^{3, 201}_2
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨  b^{3, 201}_1
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨  p_600 ∨ -b^{3, 201}_0
c  in DIMACS:
-6989  6990 -6991  600  6992 0
-6989  6990 -6991  600  6993 0
-6989  6990 -6991  600 -6994 0

c  -2-1 --> break 
c    ( b^{3, 200}_2 ∧  b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨  b^{3, 200}_0 ∨  p_600 ∨ break
c  in DIMACS:
-6989 -6990  6991  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 200}_2 ∧ -b^{3, 200}_1 ∧ -b^{3, 200}_0 ∧ true) 
c  in CNF:
c    -b^{3, 200}_2 ∨  b^{3, 200}_1 ∨  b^{3, 200}_0 ∨ false 
c  in DIMACS:
-6989  6990  6991  0

c  3 does not represent an automaton state.
c    -(-b^{3, 200}_2 ∧  b^{3, 200}_1 ∧  b^{3, 200}_0 ∧ true) 
c  in CNF:
c     b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ false 
c  in DIMACS:
 6989 -6990 -6991  0
c  -3 does not represent an automaton state.
c    -( b^{3, 200}_2 ∧  b^{3, 200}_1 ∧  b^{3, 200}_0 ∧ true) 
c  in CNF:
c    -b^{3, 200}_2 ∨ -b^{3, 200}_1 ∨ -b^{3, 200}_0 ∨ false 
c  in DIMACS:
-6989 -6990 -6991  0

c i = 201
c  -2+1 --> -1
c    ( b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧  p_603) -> ( b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0)
c  in CNF:
c    -b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨  b^{3, 202}_2
c    -b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_1
c    -b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨  b^{3, 202}_0
c  in DIMACS:
-6992 -6993  6994 -603  6995 0
-6992 -6993  6994 -603 -6996 0
-6992 -6993  6994 -603  6997 0

c  -1+1 --> 0
c    ( b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0 ∧  p_603) -> (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧ -b^{3, 202}_0)
c  in CNF:
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_2
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_1
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_0
c  in DIMACS:
-6992  6993 -6994 -603 -6995 0
-6992  6993 -6994 -603 -6996 0
-6992  6993 -6994 -603 -6997 0

c  0+1 --> 1
c    (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧  p_603) -> (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0)
c  in CNF:
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_2
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_1
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨  b^{3, 202}_0
c  in DIMACS:
 6992  6993  6994 -603 -6995 0
 6992  6993  6994 -603 -6996 0
 6992  6993  6994 -603  6997 0

c  1+1 --> 2
c    (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0 ∧  p_603) -> (-b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0)
c  in CNF:
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_2
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨  b^{3, 202}_1
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ -p_603 ∨ -b^{3, 202}_0
c  in DIMACS:
 6992  6993 -6994 -603 -6995 0
 6992  6993 -6994 -603  6996 0
 6992  6993 -6994 -603 -6997 0

c  2+1 --> break 
c    (-b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧  p_603) -> break
c  in CNF:
c     b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ -p_603 ∨ break
c  in DIMACS:
 6992 -6993  6994 -603 1162 0


c  2-1 --> 1
c    (-b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧ -p_603) -> (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0)
c  in CNF:
c     b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_2
c     b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_1
c     b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨  b^{3, 202}_0
c  in DIMACS:
 6992 -6993  6994  603 -6995 0
 6992 -6993  6994  603 -6996 0
 6992 -6993  6994  603  6997 0

c  1-1 --> 0
c    (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0 ∧ -p_603) -> (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧ -b^{3, 202}_0)
c  in CNF:
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_2
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_1
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_0
c  in DIMACS:
 6992  6993 -6994  603 -6995 0
 6992  6993 -6994  603 -6996 0
 6992  6993 -6994  603 -6997 0

c  0-1 --> -1
c    (-b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧ -p_603) -> ( b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0)
c  in CNF:
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨  b^{3, 202}_2
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_1
c     b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨  b^{3, 202}_0
c  in DIMACS:
 6992  6993  6994  603  6995 0
 6992  6993  6994  603 -6996 0
 6992  6993  6994  603  6997 0

c  -1-1 --> -2
c    ( b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧  b^{3, 201}_0 ∧ -p_603) -> ( b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0)
c  in CNF:
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨  b^{3, 202}_2
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨  b^{3, 202}_1
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨  p_603 ∨ -b^{3, 202}_0
c  in DIMACS:
-6992  6993 -6994  603  6995 0
-6992  6993 -6994  603  6996 0
-6992  6993 -6994  603 -6997 0

c  -2-1 --> break 
c    ( b^{3, 201}_2 ∧  b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧ -p_603) -> break
c  in CNF:
c    -b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨  b^{3, 201}_0 ∨  p_603 ∨ break
c  in DIMACS:
-6992 -6993  6994  603 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 201}_2 ∧ -b^{3, 201}_1 ∧ -b^{3, 201}_0 ∧ true) 
c  in CNF:
c    -b^{3, 201}_2 ∨  b^{3, 201}_1 ∨  b^{3, 201}_0 ∨ false 
c  in DIMACS:
-6992  6993  6994  0

c  3 does not represent an automaton state.
c    -(-b^{3, 201}_2 ∧  b^{3, 201}_1 ∧  b^{3, 201}_0 ∧ true) 
c  in CNF:
c     b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ false 
c  in DIMACS:
 6992 -6993 -6994  0
c  -3 does not represent an automaton state.
c    -( b^{3, 201}_2 ∧  b^{3, 201}_1 ∧  b^{3, 201}_0 ∧ true) 
c  in CNF:
c    -b^{3, 201}_2 ∨ -b^{3, 201}_1 ∨ -b^{3, 201}_0 ∨ false 
c  in DIMACS:
-6992 -6993 -6994  0

c i = 202
c  -2+1 --> -1
c    ( b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧  p_606) -> ( b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0)
c  in CNF:
c    -b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨  b^{3, 203}_2
c    -b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_1
c    -b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨  b^{3, 203}_0
c  in DIMACS:
-6995 -6996  6997 -606  6998 0
-6995 -6996  6997 -606 -6999 0
-6995 -6996  6997 -606  7000 0

c  -1+1 --> 0
c    ( b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0 ∧  p_606) -> (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧ -b^{3, 203}_0)
c  in CNF:
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_2
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_1
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_0
c  in DIMACS:
-6995  6996 -6997 -606 -6998 0
-6995  6996 -6997 -606 -6999 0
-6995  6996 -6997 -606 -7000 0

c  0+1 --> 1
c    (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧  p_606) -> (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0)
c  in CNF:
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_2
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_1
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨  b^{3, 203}_0
c  in DIMACS:
 6995  6996  6997 -606 -6998 0
 6995  6996  6997 -606 -6999 0
 6995  6996  6997 -606  7000 0

c  1+1 --> 2
c    (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0 ∧  p_606) -> (-b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0)
c  in CNF:
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_2
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨  b^{3, 203}_1
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ -p_606 ∨ -b^{3, 203}_0
c  in DIMACS:
 6995  6996 -6997 -606 -6998 0
 6995  6996 -6997 -606  6999 0
 6995  6996 -6997 -606 -7000 0

c  2+1 --> break 
c    (-b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧  p_606) -> break
c  in CNF:
c     b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 6995 -6996  6997 -606 1162 0


c  2-1 --> 1
c    (-b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧ -p_606) -> (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0)
c  in CNF:
c     b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_2
c     b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_1
c     b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨  b^{3, 203}_0
c  in DIMACS:
 6995 -6996  6997  606 -6998 0
 6995 -6996  6997  606 -6999 0
 6995 -6996  6997  606  7000 0

c  1-1 --> 0
c    (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0 ∧ -p_606) -> (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧ -b^{3, 203}_0)
c  in CNF:
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_2
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_1
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_0
c  in DIMACS:
 6995  6996 -6997  606 -6998 0
 6995  6996 -6997  606 -6999 0
 6995  6996 -6997  606 -7000 0

c  0-1 --> -1
c    (-b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧ -p_606) -> ( b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0)
c  in CNF:
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨  b^{3, 203}_2
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_1
c     b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨  b^{3, 203}_0
c  in DIMACS:
 6995  6996  6997  606  6998 0
 6995  6996  6997  606 -6999 0
 6995  6996  6997  606  7000 0

c  -1-1 --> -2
c    ( b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧  b^{3, 202}_0 ∧ -p_606) -> ( b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0)
c  in CNF:
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨  b^{3, 203}_2
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨  b^{3, 203}_1
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨  p_606 ∨ -b^{3, 203}_0
c  in DIMACS:
-6995  6996 -6997  606  6998 0
-6995  6996 -6997  606  6999 0
-6995  6996 -6997  606 -7000 0

c  -2-1 --> break 
c    ( b^{3, 202}_2 ∧  b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨  b^{3, 202}_0 ∨  p_606 ∨ break
c  in DIMACS:
-6995 -6996  6997  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 202}_2 ∧ -b^{3, 202}_1 ∧ -b^{3, 202}_0 ∧ true) 
c  in CNF:
c    -b^{3, 202}_2 ∨  b^{3, 202}_1 ∨  b^{3, 202}_0 ∨ false 
c  in DIMACS:
-6995  6996  6997  0

c  3 does not represent an automaton state.
c    -(-b^{3, 202}_2 ∧  b^{3, 202}_1 ∧  b^{3, 202}_0 ∧ true) 
c  in CNF:
c     b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ false 
c  in DIMACS:
 6995 -6996 -6997  0
c  -3 does not represent an automaton state.
c    -( b^{3, 202}_2 ∧  b^{3, 202}_1 ∧  b^{3, 202}_0 ∧ true) 
c  in CNF:
c    -b^{3, 202}_2 ∨ -b^{3, 202}_1 ∨ -b^{3, 202}_0 ∨ false 
c  in DIMACS:
-6995 -6996 -6997  0

c i = 203
c  -2+1 --> -1
c    ( b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧  p_609) -> ( b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0)
c  in CNF:
c    -b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨  b^{3, 204}_2
c    -b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_1
c    -b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨  b^{3, 204}_0
c  in DIMACS:
-6998 -6999  7000 -609  7001 0
-6998 -6999  7000 -609 -7002 0
-6998 -6999  7000 -609  7003 0

c  -1+1 --> 0
c    ( b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0 ∧  p_609) -> (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧ -b^{3, 204}_0)
c  in CNF:
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_2
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_1
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_0
c  in DIMACS:
-6998  6999 -7000 -609 -7001 0
-6998  6999 -7000 -609 -7002 0
-6998  6999 -7000 -609 -7003 0

c  0+1 --> 1
c    (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧  p_609) -> (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0)
c  in CNF:
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_2
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_1
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨  b^{3, 204}_0
c  in DIMACS:
 6998  6999  7000 -609 -7001 0
 6998  6999  7000 -609 -7002 0
 6998  6999  7000 -609  7003 0

c  1+1 --> 2
c    (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0 ∧  p_609) -> (-b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0)
c  in CNF:
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_2
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨  b^{3, 204}_1
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ -p_609 ∨ -b^{3, 204}_0
c  in DIMACS:
 6998  6999 -7000 -609 -7001 0
 6998  6999 -7000 -609  7002 0
 6998  6999 -7000 -609 -7003 0

c  2+1 --> break 
c    (-b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧  p_609) -> break
c  in CNF:
c     b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 6998 -6999  7000 -609 1162 0


c  2-1 --> 1
c    (-b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧ -p_609) -> (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0)
c  in CNF:
c     b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_2
c     b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_1
c     b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨  b^{3, 204}_0
c  in DIMACS:
 6998 -6999  7000  609 -7001 0
 6998 -6999  7000  609 -7002 0
 6998 -6999  7000  609  7003 0

c  1-1 --> 0
c    (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0 ∧ -p_609) -> (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧ -b^{3, 204}_0)
c  in CNF:
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_2
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_1
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_0
c  in DIMACS:
 6998  6999 -7000  609 -7001 0
 6998  6999 -7000  609 -7002 0
 6998  6999 -7000  609 -7003 0

c  0-1 --> -1
c    (-b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧ -p_609) -> ( b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0)
c  in CNF:
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨  b^{3, 204}_2
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_1
c     b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨  b^{3, 204}_0
c  in DIMACS:
 6998  6999  7000  609  7001 0
 6998  6999  7000  609 -7002 0
 6998  6999  7000  609  7003 0

c  -1-1 --> -2
c    ( b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧  b^{3, 203}_0 ∧ -p_609) -> ( b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0)
c  in CNF:
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨  b^{3, 204}_2
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨  b^{3, 204}_1
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨  p_609 ∨ -b^{3, 204}_0
c  in DIMACS:
-6998  6999 -7000  609  7001 0
-6998  6999 -7000  609  7002 0
-6998  6999 -7000  609 -7003 0

c  -2-1 --> break 
c    ( b^{3, 203}_2 ∧  b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨  b^{3, 203}_0 ∨  p_609 ∨ break
c  in DIMACS:
-6998 -6999  7000  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 203}_2 ∧ -b^{3, 203}_1 ∧ -b^{3, 203}_0 ∧ true) 
c  in CNF:
c    -b^{3, 203}_2 ∨  b^{3, 203}_1 ∨  b^{3, 203}_0 ∨ false 
c  in DIMACS:
-6998  6999  7000  0

c  3 does not represent an automaton state.
c    -(-b^{3, 203}_2 ∧  b^{3, 203}_1 ∧  b^{3, 203}_0 ∧ true) 
c  in CNF:
c     b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ false 
c  in DIMACS:
 6998 -6999 -7000  0
c  -3 does not represent an automaton state.
c    -( b^{3, 203}_2 ∧  b^{3, 203}_1 ∧  b^{3, 203}_0 ∧ true) 
c  in CNF:
c    -b^{3, 203}_2 ∨ -b^{3, 203}_1 ∨ -b^{3, 203}_0 ∨ false 
c  in DIMACS:
-6998 -6999 -7000  0

c i = 204
c  -2+1 --> -1
c    ( b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧  p_612) -> ( b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0)
c  in CNF:
c    -b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨  b^{3, 205}_2
c    -b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_1
c    -b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨  b^{3, 205}_0
c  in DIMACS:
-7001 -7002  7003 -612  7004 0
-7001 -7002  7003 -612 -7005 0
-7001 -7002  7003 -612  7006 0

c  -1+1 --> 0
c    ( b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0 ∧  p_612) -> (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧ -b^{3, 205}_0)
c  in CNF:
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_2
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_1
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_0
c  in DIMACS:
-7001  7002 -7003 -612 -7004 0
-7001  7002 -7003 -612 -7005 0
-7001  7002 -7003 -612 -7006 0

c  0+1 --> 1
c    (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧  p_612) -> (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0)
c  in CNF:
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_2
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_1
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨  b^{3, 205}_0
c  in DIMACS:
 7001  7002  7003 -612 -7004 0
 7001  7002  7003 -612 -7005 0
 7001  7002  7003 -612  7006 0

c  1+1 --> 2
c    (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0 ∧  p_612) -> (-b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0)
c  in CNF:
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_2
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨  b^{3, 205}_1
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ -p_612 ∨ -b^{3, 205}_0
c  in DIMACS:
 7001  7002 -7003 -612 -7004 0
 7001  7002 -7003 -612  7005 0
 7001  7002 -7003 -612 -7006 0

c  2+1 --> break 
c    (-b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧  p_612) -> break
c  in CNF:
c     b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 7001 -7002  7003 -612 1162 0


c  2-1 --> 1
c    (-b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧ -p_612) -> (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0)
c  in CNF:
c     b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_2
c     b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_1
c     b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨  b^{3, 205}_0
c  in DIMACS:
 7001 -7002  7003  612 -7004 0
 7001 -7002  7003  612 -7005 0
 7001 -7002  7003  612  7006 0

c  1-1 --> 0
c    (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0 ∧ -p_612) -> (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧ -b^{3, 205}_0)
c  in CNF:
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_2
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_1
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_0
c  in DIMACS:
 7001  7002 -7003  612 -7004 0
 7001  7002 -7003  612 -7005 0
 7001  7002 -7003  612 -7006 0

c  0-1 --> -1
c    (-b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧ -p_612) -> ( b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0)
c  in CNF:
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨  b^{3, 205}_2
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_1
c     b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨  b^{3, 205}_0
c  in DIMACS:
 7001  7002  7003  612  7004 0
 7001  7002  7003  612 -7005 0
 7001  7002  7003  612  7006 0

c  -1-1 --> -2
c    ( b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧  b^{3, 204}_0 ∧ -p_612) -> ( b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0)
c  in CNF:
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨  b^{3, 205}_2
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨  b^{3, 205}_1
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨  p_612 ∨ -b^{3, 205}_0
c  in DIMACS:
-7001  7002 -7003  612  7004 0
-7001  7002 -7003  612  7005 0
-7001  7002 -7003  612 -7006 0

c  -2-1 --> break 
c    ( b^{3, 204}_2 ∧  b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨  b^{3, 204}_0 ∨  p_612 ∨ break
c  in DIMACS:
-7001 -7002  7003  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 204}_2 ∧ -b^{3, 204}_1 ∧ -b^{3, 204}_0 ∧ true) 
c  in CNF:
c    -b^{3, 204}_2 ∨  b^{3, 204}_1 ∨  b^{3, 204}_0 ∨ false 
c  in DIMACS:
-7001  7002  7003  0

c  3 does not represent an automaton state.
c    -(-b^{3, 204}_2 ∧  b^{3, 204}_1 ∧  b^{3, 204}_0 ∧ true) 
c  in CNF:
c     b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ false 
c  in DIMACS:
 7001 -7002 -7003  0
c  -3 does not represent an automaton state.
c    -( b^{3, 204}_2 ∧  b^{3, 204}_1 ∧  b^{3, 204}_0 ∧ true) 
c  in CNF:
c    -b^{3, 204}_2 ∨ -b^{3, 204}_1 ∨ -b^{3, 204}_0 ∨ false 
c  in DIMACS:
-7001 -7002 -7003  0

c i = 205
c  -2+1 --> -1
c    ( b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧  p_615) -> ( b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0)
c  in CNF:
c    -b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨  b^{3, 206}_2
c    -b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_1
c    -b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨  b^{3, 206}_0
c  in DIMACS:
-7004 -7005  7006 -615  7007 0
-7004 -7005  7006 -615 -7008 0
-7004 -7005  7006 -615  7009 0

c  -1+1 --> 0
c    ( b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0 ∧  p_615) -> (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧ -b^{3, 206}_0)
c  in CNF:
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_2
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_1
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_0
c  in DIMACS:
-7004  7005 -7006 -615 -7007 0
-7004  7005 -7006 -615 -7008 0
-7004  7005 -7006 -615 -7009 0

c  0+1 --> 1
c    (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧  p_615) -> (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0)
c  in CNF:
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_2
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_1
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨  b^{3, 206}_0
c  in DIMACS:
 7004  7005  7006 -615 -7007 0
 7004  7005  7006 -615 -7008 0
 7004  7005  7006 -615  7009 0

c  1+1 --> 2
c    (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0 ∧  p_615) -> (-b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0)
c  in CNF:
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_2
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨  b^{3, 206}_1
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ -p_615 ∨ -b^{3, 206}_0
c  in DIMACS:
 7004  7005 -7006 -615 -7007 0
 7004  7005 -7006 -615  7008 0
 7004  7005 -7006 -615 -7009 0

c  2+1 --> break 
c    (-b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧  p_615) -> break
c  in CNF:
c     b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 7004 -7005  7006 -615 1162 0


c  2-1 --> 1
c    (-b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧ -p_615) -> (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0)
c  in CNF:
c     b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_2
c     b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_1
c     b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨  b^{3, 206}_0
c  in DIMACS:
 7004 -7005  7006  615 -7007 0
 7004 -7005  7006  615 -7008 0
 7004 -7005  7006  615  7009 0

c  1-1 --> 0
c    (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0 ∧ -p_615) -> (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧ -b^{3, 206}_0)
c  in CNF:
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_2
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_1
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_0
c  in DIMACS:
 7004  7005 -7006  615 -7007 0
 7004  7005 -7006  615 -7008 0
 7004  7005 -7006  615 -7009 0

c  0-1 --> -1
c    (-b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧ -p_615) -> ( b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0)
c  in CNF:
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨  b^{3, 206}_2
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_1
c     b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨  b^{3, 206}_0
c  in DIMACS:
 7004  7005  7006  615  7007 0
 7004  7005  7006  615 -7008 0
 7004  7005  7006  615  7009 0

c  -1-1 --> -2
c    ( b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧  b^{3, 205}_0 ∧ -p_615) -> ( b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0)
c  in CNF:
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨  b^{3, 206}_2
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨  b^{3, 206}_1
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨  p_615 ∨ -b^{3, 206}_0
c  in DIMACS:
-7004  7005 -7006  615  7007 0
-7004  7005 -7006  615  7008 0
-7004  7005 -7006  615 -7009 0

c  -2-1 --> break 
c    ( b^{3, 205}_2 ∧  b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨  b^{3, 205}_0 ∨  p_615 ∨ break
c  in DIMACS:
-7004 -7005  7006  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 205}_2 ∧ -b^{3, 205}_1 ∧ -b^{3, 205}_0 ∧ true) 
c  in CNF:
c    -b^{3, 205}_2 ∨  b^{3, 205}_1 ∨  b^{3, 205}_0 ∨ false 
c  in DIMACS:
-7004  7005  7006  0

c  3 does not represent an automaton state.
c    -(-b^{3, 205}_2 ∧  b^{3, 205}_1 ∧  b^{3, 205}_0 ∧ true) 
c  in CNF:
c     b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ false 
c  in DIMACS:
 7004 -7005 -7006  0
c  -3 does not represent an automaton state.
c    -( b^{3, 205}_2 ∧  b^{3, 205}_1 ∧  b^{3, 205}_0 ∧ true) 
c  in CNF:
c    -b^{3, 205}_2 ∨ -b^{3, 205}_1 ∨ -b^{3, 205}_0 ∨ false 
c  in DIMACS:
-7004 -7005 -7006  0

c i = 206
c  -2+1 --> -1
c    ( b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧  p_618) -> ( b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0)
c  in CNF:
c    -b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨  b^{3, 207}_2
c    -b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_1
c    -b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨  b^{3, 207}_0
c  in DIMACS:
-7007 -7008  7009 -618  7010 0
-7007 -7008  7009 -618 -7011 0
-7007 -7008  7009 -618  7012 0

c  -1+1 --> 0
c    ( b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0 ∧  p_618) -> (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧ -b^{3, 207}_0)
c  in CNF:
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_2
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_1
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_0
c  in DIMACS:
-7007  7008 -7009 -618 -7010 0
-7007  7008 -7009 -618 -7011 0
-7007  7008 -7009 -618 -7012 0

c  0+1 --> 1
c    (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧  p_618) -> (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0)
c  in CNF:
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_2
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_1
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨  b^{3, 207}_0
c  in DIMACS:
 7007  7008  7009 -618 -7010 0
 7007  7008  7009 -618 -7011 0
 7007  7008  7009 -618  7012 0

c  1+1 --> 2
c    (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0 ∧  p_618) -> (-b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0)
c  in CNF:
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_2
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨  b^{3, 207}_1
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ -p_618 ∨ -b^{3, 207}_0
c  in DIMACS:
 7007  7008 -7009 -618 -7010 0
 7007  7008 -7009 -618  7011 0
 7007  7008 -7009 -618 -7012 0

c  2+1 --> break 
c    (-b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧  p_618) -> break
c  in CNF:
c     b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 7007 -7008  7009 -618 1162 0


c  2-1 --> 1
c    (-b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧ -p_618) -> (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0)
c  in CNF:
c     b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_2
c     b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_1
c     b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨  b^{3, 207}_0
c  in DIMACS:
 7007 -7008  7009  618 -7010 0
 7007 -7008  7009  618 -7011 0
 7007 -7008  7009  618  7012 0

c  1-1 --> 0
c    (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0 ∧ -p_618) -> (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧ -b^{3, 207}_0)
c  in CNF:
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_2
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_1
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_0
c  in DIMACS:
 7007  7008 -7009  618 -7010 0
 7007  7008 -7009  618 -7011 0
 7007  7008 -7009  618 -7012 0

c  0-1 --> -1
c    (-b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧ -p_618) -> ( b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0)
c  in CNF:
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨  b^{3, 207}_2
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_1
c     b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨  b^{3, 207}_0
c  in DIMACS:
 7007  7008  7009  618  7010 0
 7007  7008  7009  618 -7011 0
 7007  7008  7009  618  7012 0

c  -1-1 --> -2
c    ( b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧  b^{3, 206}_0 ∧ -p_618) -> ( b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0)
c  in CNF:
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨  b^{3, 207}_2
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨  b^{3, 207}_1
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨  p_618 ∨ -b^{3, 207}_0
c  in DIMACS:
-7007  7008 -7009  618  7010 0
-7007  7008 -7009  618  7011 0
-7007  7008 -7009  618 -7012 0

c  -2-1 --> break 
c    ( b^{3, 206}_2 ∧  b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨  b^{3, 206}_0 ∨  p_618 ∨ break
c  in DIMACS:
-7007 -7008  7009  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 206}_2 ∧ -b^{3, 206}_1 ∧ -b^{3, 206}_0 ∧ true) 
c  in CNF:
c    -b^{3, 206}_2 ∨  b^{3, 206}_1 ∨  b^{3, 206}_0 ∨ false 
c  in DIMACS:
-7007  7008  7009  0

c  3 does not represent an automaton state.
c    -(-b^{3, 206}_2 ∧  b^{3, 206}_1 ∧  b^{3, 206}_0 ∧ true) 
c  in CNF:
c     b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ false 
c  in DIMACS:
 7007 -7008 -7009  0
c  -3 does not represent an automaton state.
c    -( b^{3, 206}_2 ∧  b^{3, 206}_1 ∧  b^{3, 206}_0 ∧ true) 
c  in CNF:
c    -b^{3, 206}_2 ∨ -b^{3, 206}_1 ∨ -b^{3, 206}_0 ∨ false 
c  in DIMACS:
-7007 -7008 -7009  0

c i = 207
c  -2+1 --> -1
c    ( b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧  p_621) -> ( b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0)
c  in CNF:
c    -b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨  b^{3, 208}_2
c    -b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_1
c    -b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨  b^{3, 208}_0
c  in DIMACS:
-7010 -7011  7012 -621  7013 0
-7010 -7011  7012 -621 -7014 0
-7010 -7011  7012 -621  7015 0

c  -1+1 --> 0
c    ( b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0 ∧  p_621) -> (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧ -b^{3, 208}_0)
c  in CNF:
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_2
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_1
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_0
c  in DIMACS:
-7010  7011 -7012 -621 -7013 0
-7010  7011 -7012 -621 -7014 0
-7010  7011 -7012 -621 -7015 0

c  0+1 --> 1
c    (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧  p_621) -> (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0)
c  in CNF:
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_2
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_1
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨  b^{3, 208}_0
c  in DIMACS:
 7010  7011  7012 -621 -7013 0
 7010  7011  7012 -621 -7014 0
 7010  7011  7012 -621  7015 0

c  1+1 --> 2
c    (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0 ∧  p_621) -> (-b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0)
c  in CNF:
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_2
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨  b^{3, 208}_1
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ -p_621 ∨ -b^{3, 208}_0
c  in DIMACS:
 7010  7011 -7012 -621 -7013 0
 7010  7011 -7012 -621  7014 0
 7010  7011 -7012 -621 -7015 0

c  2+1 --> break 
c    (-b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧  p_621) -> break
c  in CNF:
c     b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 7010 -7011  7012 -621 1162 0


c  2-1 --> 1
c    (-b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧ -p_621) -> (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0)
c  in CNF:
c     b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_2
c     b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_1
c     b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨  b^{3, 208}_0
c  in DIMACS:
 7010 -7011  7012  621 -7013 0
 7010 -7011  7012  621 -7014 0
 7010 -7011  7012  621  7015 0

c  1-1 --> 0
c    (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0 ∧ -p_621) -> (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧ -b^{3, 208}_0)
c  in CNF:
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_2
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_1
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_0
c  in DIMACS:
 7010  7011 -7012  621 -7013 0
 7010  7011 -7012  621 -7014 0
 7010  7011 -7012  621 -7015 0

c  0-1 --> -1
c    (-b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧ -p_621) -> ( b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0)
c  in CNF:
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨  b^{3, 208}_2
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_1
c     b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨  b^{3, 208}_0
c  in DIMACS:
 7010  7011  7012  621  7013 0
 7010  7011  7012  621 -7014 0
 7010  7011  7012  621  7015 0

c  -1-1 --> -2
c    ( b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧  b^{3, 207}_0 ∧ -p_621) -> ( b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0)
c  in CNF:
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨  b^{3, 208}_2
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨  b^{3, 208}_1
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨  p_621 ∨ -b^{3, 208}_0
c  in DIMACS:
-7010  7011 -7012  621  7013 0
-7010  7011 -7012  621  7014 0
-7010  7011 -7012  621 -7015 0

c  -2-1 --> break 
c    ( b^{3, 207}_2 ∧  b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨  b^{3, 207}_0 ∨  p_621 ∨ break
c  in DIMACS:
-7010 -7011  7012  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 207}_2 ∧ -b^{3, 207}_1 ∧ -b^{3, 207}_0 ∧ true) 
c  in CNF:
c    -b^{3, 207}_2 ∨  b^{3, 207}_1 ∨  b^{3, 207}_0 ∨ false 
c  in DIMACS:
-7010  7011  7012  0

c  3 does not represent an automaton state.
c    -(-b^{3, 207}_2 ∧  b^{3, 207}_1 ∧  b^{3, 207}_0 ∧ true) 
c  in CNF:
c     b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ false 
c  in DIMACS:
 7010 -7011 -7012  0
c  -3 does not represent an automaton state.
c    -( b^{3, 207}_2 ∧  b^{3, 207}_1 ∧  b^{3, 207}_0 ∧ true) 
c  in CNF:
c    -b^{3, 207}_2 ∨ -b^{3, 207}_1 ∨ -b^{3, 207}_0 ∨ false 
c  in DIMACS:
-7010 -7011 -7012  0

c i = 208
c  -2+1 --> -1
c    ( b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧  p_624) -> ( b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0)
c  in CNF:
c    -b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨  b^{3, 209}_2
c    -b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_1
c    -b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨  b^{3, 209}_0
c  in DIMACS:
-7013 -7014  7015 -624  7016 0
-7013 -7014  7015 -624 -7017 0
-7013 -7014  7015 -624  7018 0

c  -1+1 --> 0
c    ( b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0 ∧  p_624) -> (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧ -b^{3, 209}_0)
c  in CNF:
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_2
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_1
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_0
c  in DIMACS:
-7013  7014 -7015 -624 -7016 0
-7013  7014 -7015 -624 -7017 0
-7013  7014 -7015 -624 -7018 0

c  0+1 --> 1
c    (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧  p_624) -> (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0)
c  in CNF:
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_2
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_1
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨  b^{3, 209}_0
c  in DIMACS:
 7013  7014  7015 -624 -7016 0
 7013  7014  7015 -624 -7017 0
 7013  7014  7015 -624  7018 0

c  1+1 --> 2
c    (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0 ∧  p_624) -> (-b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0)
c  in CNF:
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_2
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨  b^{3, 209}_1
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ -p_624 ∨ -b^{3, 209}_0
c  in DIMACS:
 7013  7014 -7015 -624 -7016 0
 7013  7014 -7015 -624  7017 0
 7013  7014 -7015 -624 -7018 0

c  2+1 --> break 
c    (-b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧  p_624) -> break
c  in CNF:
c     b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 7013 -7014  7015 -624 1162 0


c  2-1 --> 1
c    (-b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧ -p_624) -> (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0)
c  in CNF:
c     b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_2
c     b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_1
c     b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨  b^{3, 209}_0
c  in DIMACS:
 7013 -7014  7015  624 -7016 0
 7013 -7014  7015  624 -7017 0
 7013 -7014  7015  624  7018 0

c  1-1 --> 0
c    (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0 ∧ -p_624) -> (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧ -b^{3, 209}_0)
c  in CNF:
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_2
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_1
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_0
c  in DIMACS:
 7013  7014 -7015  624 -7016 0
 7013  7014 -7015  624 -7017 0
 7013  7014 -7015  624 -7018 0

c  0-1 --> -1
c    (-b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧ -p_624) -> ( b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0)
c  in CNF:
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨  b^{3, 209}_2
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_1
c     b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨  b^{3, 209}_0
c  in DIMACS:
 7013  7014  7015  624  7016 0
 7013  7014  7015  624 -7017 0
 7013  7014  7015  624  7018 0

c  -1-1 --> -2
c    ( b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧  b^{3, 208}_0 ∧ -p_624) -> ( b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0)
c  in CNF:
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨  b^{3, 209}_2
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨  b^{3, 209}_1
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨  p_624 ∨ -b^{3, 209}_0
c  in DIMACS:
-7013  7014 -7015  624  7016 0
-7013  7014 -7015  624  7017 0
-7013  7014 -7015  624 -7018 0

c  -2-1 --> break 
c    ( b^{3, 208}_2 ∧  b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨  b^{3, 208}_0 ∨  p_624 ∨ break
c  in DIMACS:
-7013 -7014  7015  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 208}_2 ∧ -b^{3, 208}_1 ∧ -b^{3, 208}_0 ∧ true) 
c  in CNF:
c    -b^{3, 208}_2 ∨  b^{3, 208}_1 ∨  b^{3, 208}_0 ∨ false 
c  in DIMACS:
-7013  7014  7015  0

c  3 does not represent an automaton state.
c    -(-b^{3, 208}_2 ∧  b^{3, 208}_1 ∧  b^{3, 208}_0 ∧ true) 
c  in CNF:
c     b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ false 
c  in DIMACS:
 7013 -7014 -7015  0
c  -3 does not represent an automaton state.
c    -( b^{3, 208}_2 ∧  b^{3, 208}_1 ∧  b^{3, 208}_0 ∧ true) 
c  in CNF:
c    -b^{3, 208}_2 ∨ -b^{3, 208}_1 ∨ -b^{3, 208}_0 ∨ false 
c  in DIMACS:
-7013 -7014 -7015  0

c i = 209
c  -2+1 --> -1
c    ( b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧  p_627) -> ( b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0)
c  in CNF:
c    -b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨  b^{3, 210}_2
c    -b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_1
c    -b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨  b^{3, 210}_0
c  in DIMACS:
-7016 -7017  7018 -627  7019 0
-7016 -7017  7018 -627 -7020 0
-7016 -7017  7018 -627  7021 0

c  -1+1 --> 0
c    ( b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0 ∧  p_627) -> (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧ -b^{3, 210}_0)
c  in CNF:
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_2
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_1
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_0
c  in DIMACS:
-7016  7017 -7018 -627 -7019 0
-7016  7017 -7018 -627 -7020 0
-7016  7017 -7018 -627 -7021 0

c  0+1 --> 1
c    (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧  p_627) -> (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0)
c  in CNF:
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_2
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_1
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨  b^{3, 210}_0
c  in DIMACS:
 7016  7017  7018 -627 -7019 0
 7016  7017  7018 -627 -7020 0
 7016  7017  7018 -627  7021 0

c  1+1 --> 2
c    (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0 ∧  p_627) -> (-b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0)
c  in CNF:
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_2
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨  b^{3, 210}_1
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ -p_627 ∨ -b^{3, 210}_0
c  in DIMACS:
 7016  7017 -7018 -627 -7019 0
 7016  7017 -7018 -627  7020 0
 7016  7017 -7018 -627 -7021 0

c  2+1 --> break 
c    (-b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧  p_627) -> break
c  in CNF:
c     b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 7016 -7017  7018 -627 1162 0


c  2-1 --> 1
c    (-b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧ -p_627) -> (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0)
c  in CNF:
c     b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_2
c     b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_1
c     b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨  b^{3, 210}_0
c  in DIMACS:
 7016 -7017  7018  627 -7019 0
 7016 -7017  7018  627 -7020 0
 7016 -7017  7018  627  7021 0

c  1-1 --> 0
c    (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0 ∧ -p_627) -> (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧ -b^{3, 210}_0)
c  in CNF:
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_2
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_1
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_0
c  in DIMACS:
 7016  7017 -7018  627 -7019 0
 7016  7017 -7018  627 -7020 0
 7016  7017 -7018  627 -7021 0

c  0-1 --> -1
c    (-b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧ -p_627) -> ( b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0)
c  in CNF:
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨  b^{3, 210}_2
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_1
c     b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨  b^{3, 210}_0
c  in DIMACS:
 7016  7017  7018  627  7019 0
 7016  7017  7018  627 -7020 0
 7016  7017  7018  627  7021 0

c  -1-1 --> -2
c    ( b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧  b^{3, 209}_0 ∧ -p_627) -> ( b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0)
c  in CNF:
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨  b^{3, 210}_2
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨  b^{3, 210}_1
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨  p_627 ∨ -b^{3, 210}_0
c  in DIMACS:
-7016  7017 -7018  627  7019 0
-7016  7017 -7018  627  7020 0
-7016  7017 -7018  627 -7021 0

c  -2-1 --> break 
c    ( b^{3, 209}_2 ∧  b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨  b^{3, 209}_0 ∨  p_627 ∨ break
c  in DIMACS:
-7016 -7017  7018  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 209}_2 ∧ -b^{3, 209}_1 ∧ -b^{3, 209}_0 ∧ true) 
c  in CNF:
c    -b^{3, 209}_2 ∨  b^{3, 209}_1 ∨  b^{3, 209}_0 ∨ false 
c  in DIMACS:
-7016  7017  7018  0

c  3 does not represent an automaton state.
c    -(-b^{3, 209}_2 ∧  b^{3, 209}_1 ∧  b^{3, 209}_0 ∧ true) 
c  in CNF:
c     b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ false 
c  in DIMACS:
 7016 -7017 -7018  0
c  -3 does not represent an automaton state.
c    -( b^{3, 209}_2 ∧  b^{3, 209}_1 ∧  b^{3, 209}_0 ∧ true) 
c  in CNF:
c    -b^{3, 209}_2 ∨ -b^{3, 209}_1 ∨ -b^{3, 209}_0 ∨ false 
c  in DIMACS:
-7016 -7017 -7018  0

c i = 210
c  -2+1 --> -1
c    ( b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧  p_630) -> ( b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0)
c  in CNF:
c    -b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨  b^{3, 211}_2
c    -b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_1
c    -b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨  b^{3, 211}_0
c  in DIMACS:
-7019 -7020  7021 -630  7022 0
-7019 -7020  7021 -630 -7023 0
-7019 -7020  7021 -630  7024 0

c  -1+1 --> 0
c    ( b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0 ∧  p_630) -> (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧ -b^{3, 211}_0)
c  in CNF:
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_2
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_1
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_0
c  in DIMACS:
-7019  7020 -7021 -630 -7022 0
-7019  7020 -7021 -630 -7023 0
-7019  7020 -7021 -630 -7024 0

c  0+1 --> 1
c    (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧  p_630) -> (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0)
c  in CNF:
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_2
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_1
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨  b^{3, 211}_0
c  in DIMACS:
 7019  7020  7021 -630 -7022 0
 7019  7020  7021 -630 -7023 0
 7019  7020  7021 -630  7024 0

c  1+1 --> 2
c    (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0 ∧  p_630) -> (-b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0)
c  in CNF:
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_2
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨  b^{3, 211}_1
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ -p_630 ∨ -b^{3, 211}_0
c  in DIMACS:
 7019  7020 -7021 -630 -7022 0
 7019  7020 -7021 -630  7023 0
 7019  7020 -7021 -630 -7024 0

c  2+1 --> break 
c    (-b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧  p_630) -> break
c  in CNF:
c     b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 7019 -7020  7021 -630 1162 0


c  2-1 --> 1
c    (-b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧ -p_630) -> (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0)
c  in CNF:
c     b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_2
c     b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_1
c     b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨  b^{3, 211}_0
c  in DIMACS:
 7019 -7020  7021  630 -7022 0
 7019 -7020  7021  630 -7023 0
 7019 -7020  7021  630  7024 0

c  1-1 --> 0
c    (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0 ∧ -p_630) -> (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧ -b^{3, 211}_0)
c  in CNF:
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_2
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_1
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_0
c  in DIMACS:
 7019  7020 -7021  630 -7022 0
 7019  7020 -7021  630 -7023 0
 7019  7020 -7021  630 -7024 0

c  0-1 --> -1
c    (-b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧ -p_630) -> ( b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0)
c  in CNF:
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨  b^{3, 211}_2
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_1
c     b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨  b^{3, 211}_0
c  in DIMACS:
 7019  7020  7021  630  7022 0
 7019  7020  7021  630 -7023 0
 7019  7020  7021  630  7024 0

c  -1-1 --> -2
c    ( b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧  b^{3, 210}_0 ∧ -p_630) -> ( b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0)
c  in CNF:
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨  b^{3, 211}_2
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨  b^{3, 211}_1
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨  p_630 ∨ -b^{3, 211}_0
c  in DIMACS:
-7019  7020 -7021  630  7022 0
-7019  7020 -7021  630  7023 0
-7019  7020 -7021  630 -7024 0

c  -2-1 --> break 
c    ( b^{3, 210}_2 ∧  b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨  b^{3, 210}_0 ∨  p_630 ∨ break
c  in DIMACS:
-7019 -7020  7021  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 210}_2 ∧ -b^{3, 210}_1 ∧ -b^{3, 210}_0 ∧ true) 
c  in CNF:
c    -b^{3, 210}_2 ∨  b^{3, 210}_1 ∨  b^{3, 210}_0 ∨ false 
c  in DIMACS:
-7019  7020  7021  0

c  3 does not represent an automaton state.
c    -(-b^{3, 210}_2 ∧  b^{3, 210}_1 ∧  b^{3, 210}_0 ∧ true) 
c  in CNF:
c     b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ false 
c  in DIMACS:
 7019 -7020 -7021  0
c  -3 does not represent an automaton state.
c    -( b^{3, 210}_2 ∧  b^{3, 210}_1 ∧  b^{3, 210}_0 ∧ true) 
c  in CNF:
c    -b^{3, 210}_2 ∨ -b^{3, 210}_1 ∨ -b^{3, 210}_0 ∨ false 
c  in DIMACS:
-7019 -7020 -7021  0

c i = 211
c  -2+1 --> -1
c    ( b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧  p_633) -> ( b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0)
c  in CNF:
c    -b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨  b^{3, 212}_2
c    -b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_1
c    -b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨  b^{3, 212}_0
c  in DIMACS:
-7022 -7023  7024 -633  7025 0
-7022 -7023  7024 -633 -7026 0
-7022 -7023  7024 -633  7027 0

c  -1+1 --> 0
c    ( b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0 ∧  p_633) -> (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧ -b^{3, 212}_0)
c  in CNF:
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_2
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_1
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_0
c  in DIMACS:
-7022  7023 -7024 -633 -7025 0
-7022  7023 -7024 -633 -7026 0
-7022  7023 -7024 -633 -7027 0

c  0+1 --> 1
c    (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧  p_633) -> (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0)
c  in CNF:
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_2
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_1
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨  b^{3, 212}_0
c  in DIMACS:
 7022  7023  7024 -633 -7025 0
 7022  7023  7024 -633 -7026 0
 7022  7023  7024 -633  7027 0

c  1+1 --> 2
c    (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0 ∧  p_633) -> (-b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0)
c  in CNF:
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_2
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨  b^{3, 212}_1
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ -p_633 ∨ -b^{3, 212}_0
c  in DIMACS:
 7022  7023 -7024 -633 -7025 0
 7022  7023 -7024 -633  7026 0
 7022  7023 -7024 -633 -7027 0

c  2+1 --> break 
c    (-b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧  p_633) -> break
c  in CNF:
c     b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ -p_633 ∨ break
c  in DIMACS:
 7022 -7023  7024 -633 1162 0


c  2-1 --> 1
c    (-b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧ -p_633) -> (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0)
c  in CNF:
c     b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_2
c     b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_1
c     b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨  b^{3, 212}_0
c  in DIMACS:
 7022 -7023  7024  633 -7025 0
 7022 -7023  7024  633 -7026 0
 7022 -7023  7024  633  7027 0

c  1-1 --> 0
c    (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0 ∧ -p_633) -> (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧ -b^{3, 212}_0)
c  in CNF:
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_2
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_1
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_0
c  in DIMACS:
 7022  7023 -7024  633 -7025 0
 7022  7023 -7024  633 -7026 0
 7022  7023 -7024  633 -7027 0

c  0-1 --> -1
c    (-b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧ -p_633) -> ( b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0)
c  in CNF:
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨  b^{3, 212}_2
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_1
c     b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨  b^{3, 212}_0
c  in DIMACS:
 7022  7023  7024  633  7025 0
 7022  7023  7024  633 -7026 0
 7022  7023  7024  633  7027 0

c  -1-1 --> -2
c    ( b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧  b^{3, 211}_0 ∧ -p_633) -> ( b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0)
c  in CNF:
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨  b^{3, 212}_2
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨  b^{3, 212}_1
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨  p_633 ∨ -b^{3, 212}_0
c  in DIMACS:
-7022  7023 -7024  633  7025 0
-7022  7023 -7024  633  7026 0
-7022  7023 -7024  633 -7027 0

c  -2-1 --> break 
c    ( b^{3, 211}_2 ∧  b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧ -p_633) -> break
c  in CNF:
c    -b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨  b^{3, 211}_0 ∨  p_633 ∨ break
c  in DIMACS:
-7022 -7023  7024  633 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 211}_2 ∧ -b^{3, 211}_1 ∧ -b^{3, 211}_0 ∧ true) 
c  in CNF:
c    -b^{3, 211}_2 ∨  b^{3, 211}_1 ∨  b^{3, 211}_0 ∨ false 
c  in DIMACS:
-7022  7023  7024  0

c  3 does not represent an automaton state.
c    -(-b^{3, 211}_2 ∧  b^{3, 211}_1 ∧  b^{3, 211}_0 ∧ true) 
c  in CNF:
c     b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ false 
c  in DIMACS:
 7022 -7023 -7024  0
c  -3 does not represent an automaton state.
c    -( b^{3, 211}_2 ∧  b^{3, 211}_1 ∧  b^{3, 211}_0 ∧ true) 
c  in CNF:
c    -b^{3, 211}_2 ∨ -b^{3, 211}_1 ∨ -b^{3, 211}_0 ∨ false 
c  in DIMACS:
-7022 -7023 -7024  0

c i = 212
c  -2+1 --> -1
c    ( b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧  p_636) -> ( b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0)
c  in CNF:
c    -b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨  b^{3, 213}_2
c    -b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_1
c    -b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨  b^{3, 213}_0
c  in DIMACS:
-7025 -7026  7027 -636  7028 0
-7025 -7026  7027 -636 -7029 0
-7025 -7026  7027 -636  7030 0

c  -1+1 --> 0
c    ( b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0 ∧  p_636) -> (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧ -b^{3, 213}_0)
c  in CNF:
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_2
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_1
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_0
c  in DIMACS:
-7025  7026 -7027 -636 -7028 0
-7025  7026 -7027 -636 -7029 0
-7025  7026 -7027 -636 -7030 0

c  0+1 --> 1
c    (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧  p_636) -> (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0)
c  in CNF:
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_2
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_1
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨  b^{3, 213}_0
c  in DIMACS:
 7025  7026  7027 -636 -7028 0
 7025  7026  7027 -636 -7029 0
 7025  7026  7027 -636  7030 0

c  1+1 --> 2
c    (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0 ∧  p_636) -> (-b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0)
c  in CNF:
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_2
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨  b^{3, 213}_1
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ -p_636 ∨ -b^{3, 213}_0
c  in DIMACS:
 7025  7026 -7027 -636 -7028 0
 7025  7026 -7027 -636  7029 0
 7025  7026 -7027 -636 -7030 0

c  2+1 --> break 
c    (-b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧  p_636) -> break
c  in CNF:
c     b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 7025 -7026  7027 -636 1162 0


c  2-1 --> 1
c    (-b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧ -p_636) -> (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0)
c  in CNF:
c     b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_2
c     b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_1
c     b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨  b^{3, 213}_0
c  in DIMACS:
 7025 -7026  7027  636 -7028 0
 7025 -7026  7027  636 -7029 0
 7025 -7026  7027  636  7030 0

c  1-1 --> 0
c    (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0 ∧ -p_636) -> (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧ -b^{3, 213}_0)
c  in CNF:
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_2
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_1
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_0
c  in DIMACS:
 7025  7026 -7027  636 -7028 0
 7025  7026 -7027  636 -7029 0
 7025  7026 -7027  636 -7030 0

c  0-1 --> -1
c    (-b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧ -p_636) -> ( b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0)
c  in CNF:
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨  b^{3, 213}_2
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_1
c     b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨  b^{3, 213}_0
c  in DIMACS:
 7025  7026  7027  636  7028 0
 7025  7026  7027  636 -7029 0
 7025  7026  7027  636  7030 0

c  -1-1 --> -2
c    ( b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧  b^{3, 212}_0 ∧ -p_636) -> ( b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0)
c  in CNF:
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨  b^{3, 213}_2
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨  b^{3, 213}_1
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨  p_636 ∨ -b^{3, 213}_0
c  in DIMACS:
-7025  7026 -7027  636  7028 0
-7025  7026 -7027  636  7029 0
-7025  7026 -7027  636 -7030 0

c  -2-1 --> break 
c    ( b^{3, 212}_2 ∧  b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨  b^{3, 212}_0 ∨  p_636 ∨ break
c  in DIMACS:
-7025 -7026  7027  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 212}_2 ∧ -b^{3, 212}_1 ∧ -b^{3, 212}_0 ∧ true) 
c  in CNF:
c    -b^{3, 212}_2 ∨  b^{3, 212}_1 ∨  b^{3, 212}_0 ∨ false 
c  in DIMACS:
-7025  7026  7027  0

c  3 does not represent an automaton state.
c    -(-b^{3, 212}_2 ∧  b^{3, 212}_1 ∧  b^{3, 212}_0 ∧ true) 
c  in CNF:
c     b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ false 
c  in DIMACS:
 7025 -7026 -7027  0
c  -3 does not represent an automaton state.
c    -( b^{3, 212}_2 ∧  b^{3, 212}_1 ∧  b^{3, 212}_0 ∧ true) 
c  in CNF:
c    -b^{3, 212}_2 ∨ -b^{3, 212}_1 ∨ -b^{3, 212}_0 ∨ false 
c  in DIMACS:
-7025 -7026 -7027  0

c i = 213
c  -2+1 --> -1
c    ( b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧  p_639) -> ( b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0)
c  in CNF:
c    -b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨  b^{3, 214}_2
c    -b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_1
c    -b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨  b^{3, 214}_0
c  in DIMACS:
-7028 -7029  7030 -639  7031 0
-7028 -7029  7030 -639 -7032 0
-7028 -7029  7030 -639  7033 0

c  -1+1 --> 0
c    ( b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0 ∧  p_639) -> (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧ -b^{3, 214}_0)
c  in CNF:
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_2
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_1
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_0
c  in DIMACS:
-7028  7029 -7030 -639 -7031 0
-7028  7029 -7030 -639 -7032 0
-7028  7029 -7030 -639 -7033 0

c  0+1 --> 1
c    (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧  p_639) -> (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0)
c  in CNF:
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_2
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_1
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨  b^{3, 214}_0
c  in DIMACS:
 7028  7029  7030 -639 -7031 0
 7028  7029  7030 -639 -7032 0
 7028  7029  7030 -639  7033 0

c  1+1 --> 2
c    (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0 ∧  p_639) -> (-b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0)
c  in CNF:
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_2
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨  b^{3, 214}_1
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ -p_639 ∨ -b^{3, 214}_0
c  in DIMACS:
 7028  7029 -7030 -639 -7031 0
 7028  7029 -7030 -639  7032 0
 7028  7029 -7030 -639 -7033 0

c  2+1 --> break 
c    (-b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧  p_639) -> break
c  in CNF:
c     b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ -p_639 ∨ break
c  in DIMACS:
 7028 -7029  7030 -639 1162 0


c  2-1 --> 1
c    (-b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧ -p_639) -> (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0)
c  in CNF:
c     b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_2
c     b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_1
c     b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨  b^{3, 214}_0
c  in DIMACS:
 7028 -7029  7030  639 -7031 0
 7028 -7029  7030  639 -7032 0
 7028 -7029  7030  639  7033 0

c  1-1 --> 0
c    (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0 ∧ -p_639) -> (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧ -b^{3, 214}_0)
c  in CNF:
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_2
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_1
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_0
c  in DIMACS:
 7028  7029 -7030  639 -7031 0
 7028  7029 -7030  639 -7032 0
 7028  7029 -7030  639 -7033 0

c  0-1 --> -1
c    (-b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧ -p_639) -> ( b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0)
c  in CNF:
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨  b^{3, 214}_2
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_1
c     b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨  b^{3, 214}_0
c  in DIMACS:
 7028  7029  7030  639  7031 0
 7028  7029  7030  639 -7032 0
 7028  7029  7030  639  7033 0

c  -1-1 --> -2
c    ( b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧  b^{3, 213}_0 ∧ -p_639) -> ( b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0)
c  in CNF:
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨  b^{3, 214}_2
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨  b^{3, 214}_1
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨  p_639 ∨ -b^{3, 214}_0
c  in DIMACS:
-7028  7029 -7030  639  7031 0
-7028  7029 -7030  639  7032 0
-7028  7029 -7030  639 -7033 0

c  -2-1 --> break 
c    ( b^{3, 213}_2 ∧  b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧ -p_639) -> break
c  in CNF:
c    -b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨  b^{3, 213}_0 ∨  p_639 ∨ break
c  in DIMACS:
-7028 -7029  7030  639 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 213}_2 ∧ -b^{3, 213}_1 ∧ -b^{3, 213}_0 ∧ true) 
c  in CNF:
c    -b^{3, 213}_2 ∨  b^{3, 213}_1 ∨  b^{3, 213}_0 ∨ false 
c  in DIMACS:
-7028  7029  7030  0

c  3 does not represent an automaton state.
c    -(-b^{3, 213}_2 ∧  b^{3, 213}_1 ∧  b^{3, 213}_0 ∧ true) 
c  in CNF:
c     b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ false 
c  in DIMACS:
 7028 -7029 -7030  0
c  -3 does not represent an automaton state.
c    -( b^{3, 213}_2 ∧  b^{3, 213}_1 ∧  b^{3, 213}_0 ∧ true) 
c  in CNF:
c    -b^{3, 213}_2 ∨ -b^{3, 213}_1 ∨ -b^{3, 213}_0 ∨ false 
c  in DIMACS:
-7028 -7029 -7030  0

c i = 214
c  -2+1 --> -1
c    ( b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧  p_642) -> ( b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0)
c  in CNF:
c    -b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨  b^{3, 215}_2
c    -b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_1
c    -b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨  b^{3, 215}_0
c  in DIMACS:
-7031 -7032  7033 -642  7034 0
-7031 -7032  7033 -642 -7035 0
-7031 -7032  7033 -642  7036 0

c  -1+1 --> 0
c    ( b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0 ∧  p_642) -> (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧ -b^{3, 215}_0)
c  in CNF:
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_2
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_1
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_0
c  in DIMACS:
-7031  7032 -7033 -642 -7034 0
-7031  7032 -7033 -642 -7035 0
-7031  7032 -7033 -642 -7036 0

c  0+1 --> 1
c    (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧  p_642) -> (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0)
c  in CNF:
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_2
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_1
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨  b^{3, 215}_0
c  in DIMACS:
 7031  7032  7033 -642 -7034 0
 7031  7032  7033 -642 -7035 0
 7031  7032  7033 -642  7036 0

c  1+1 --> 2
c    (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0 ∧  p_642) -> (-b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0)
c  in CNF:
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_2
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨  b^{3, 215}_1
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ -p_642 ∨ -b^{3, 215}_0
c  in DIMACS:
 7031  7032 -7033 -642 -7034 0
 7031  7032 -7033 -642  7035 0
 7031  7032 -7033 -642 -7036 0

c  2+1 --> break 
c    (-b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧  p_642) -> break
c  in CNF:
c     b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 7031 -7032  7033 -642 1162 0


c  2-1 --> 1
c    (-b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧ -p_642) -> (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0)
c  in CNF:
c     b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_2
c     b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_1
c     b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨  b^{3, 215}_0
c  in DIMACS:
 7031 -7032  7033  642 -7034 0
 7031 -7032  7033  642 -7035 0
 7031 -7032  7033  642  7036 0

c  1-1 --> 0
c    (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0 ∧ -p_642) -> (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧ -b^{3, 215}_0)
c  in CNF:
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_2
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_1
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_0
c  in DIMACS:
 7031  7032 -7033  642 -7034 0
 7031  7032 -7033  642 -7035 0
 7031  7032 -7033  642 -7036 0

c  0-1 --> -1
c    (-b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧ -p_642) -> ( b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0)
c  in CNF:
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨  b^{3, 215}_2
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_1
c     b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨  b^{3, 215}_0
c  in DIMACS:
 7031  7032  7033  642  7034 0
 7031  7032  7033  642 -7035 0
 7031  7032  7033  642  7036 0

c  -1-1 --> -2
c    ( b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧  b^{3, 214}_0 ∧ -p_642) -> ( b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0)
c  in CNF:
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨  b^{3, 215}_2
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨  b^{3, 215}_1
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨  p_642 ∨ -b^{3, 215}_0
c  in DIMACS:
-7031  7032 -7033  642  7034 0
-7031  7032 -7033  642  7035 0
-7031  7032 -7033  642 -7036 0

c  -2-1 --> break 
c    ( b^{3, 214}_2 ∧  b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨  b^{3, 214}_0 ∨  p_642 ∨ break
c  in DIMACS:
-7031 -7032  7033  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 214}_2 ∧ -b^{3, 214}_1 ∧ -b^{3, 214}_0 ∧ true) 
c  in CNF:
c    -b^{3, 214}_2 ∨  b^{3, 214}_1 ∨  b^{3, 214}_0 ∨ false 
c  in DIMACS:
-7031  7032  7033  0

c  3 does not represent an automaton state.
c    -(-b^{3, 214}_2 ∧  b^{3, 214}_1 ∧  b^{3, 214}_0 ∧ true) 
c  in CNF:
c     b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ false 
c  in DIMACS:
 7031 -7032 -7033  0
c  -3 does not represent an automaton state.
c    -( b^{3, 214}_2 ∧  b^{3, 214}_1 ∧  b^{3, 214}_0 ∧ true) 
c  in CNF:
c    -b^{3, 214}_2 ∨ -b^{3, 214}_1 ∨ -b^{3, 214}_0 ∨ false 
c  in DIMACS:
-7031 -7032 -7033  0

c i = 215
c  -2+1 --> -1
c    ( b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧  p_645) -> ( b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0)
c  in CNF:
c    -b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨  b^{3, 216}_2
c    -b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_1
c    -b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨  b^{3, 216}_0
c  in DIMACS:
-7034 -7035  7036 -645  7037 0
-7034 -7035  7036 -645 -7038 0
-7034 -7035  7036 -645  7039 0

c  -1+1 --> 0
c    ( b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0 ∧  p_645) -> (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧ -b^{3, 216}_0)
c  in CNF:
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_2
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_1
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_0
c  in DIMACS:
-7034  7035 -7036 -645 -7037 0
-7034  7035 -7036 -645 -7038 0
-7034  7035 -7036 -645 -7039 0

c  0+1 --> 1
c    (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧  p_645) -> (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0)
c  in CNF:
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_2
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_1
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨  b^{3, 216}_0
c  in DIMACS:
 7034  7035  7036 -645 -7037 0
 7034  7035  7036 -645 -7038 0
 7034  7035  7036 -645  7039 0

c  1+1 --> 2
c    (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0 ∧  p_645) -> (-b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0)
c  in CNF:
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_2
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨  b^{3, 216}_1
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ -p_645 ∨ -b^{3, 216}_0
c  in DIMACS:
 7034  7035 -7036 -645 -7037 0
 7034  7035 -7036 -645  7038 0
 7034  7035 -7036 -645 -7039 0

c  2+1 --> break 
c    (-b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧  p_645) -> break
c  in CNF:
c     b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 7034 -7035  7036 -645 1162 0


c  2-1 --> 1
c    (-b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧ -p_645) -> (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0)
c  in CNF:
c     b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_2
c     b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_1
c     b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨  b^{3, 216}_0
c  in DIMACS:
 7034 -7035  7036  645 -7037 0
 7034 -7035  7036  645 -7038 0
 7034 -7035  7036  645  7039 0

c  1-1 --> 0
c    (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0 ∧ -p_645) -> (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧ -b^{3, 216}_0)
c  in CNF:
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_2
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_1
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_0
c  in DIMACS:
 7034  7035 -7036  645 -7037 0
 7034  7035 -7036  645 -7038 0
 7034  7035 -7036  645 -7039 0

c  0-1 --> -1
c    (-b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧ -p_645) -> ( b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0)
c  in CNF:
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨  b^{3, 216}_2
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_1
c     b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨  b^{3, 216}_0
c  in DIMACS:
 7034  7035  7036  645  7037 0
 7034  7035  7036  645 -7038 0
 7034  7035  7036  645  7039 0

c  -1-1 --> -2
c    ( b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧  b^{3, 215}_0 ∧ -p_645) -> ( b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0)
c  in CNF:
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨  b^{3, 216}_2
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨  b^{3, 216}_1
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨  p_645 ∨ -b^{3, 216}_0
c  in DIMACS:
-7034  7035 -7036  645  7037 0
-7034  7035 -7036  645  7038 0
-7034  7035 -7036  645 -7039 0

c  -2-1 --> break 
c    ( b^{3, 215}_2 ∧  b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨  b^{3, 215}_0 ∨  p_645 ∨ break
c  in DIMACS:
-7034 -7035  7036  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 215}_2 ∧ -b^{3, 215}_1 ∧ -b^{3, 215}_0 ∧ true) 
c  in CNF:
c    -b^{3, 215}_2 ∨  b^{3, 215}_1 ∨  b^{3, 215}_0 ∨ false 
c  in DIMACS:
-7034  7035  7036  0

c  3 does not represent an automaton state.
c    -(-b^{3, 215}_2 ∧  b^{3, 215}_1 ∧  b^{3, 215}_0 ∧ true) 
c  in CNF:
c     b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ false 
c  in DIMACS:
 7034 -7035 -7036  0
c  -3 does not represent an automaton state.
c    -( b^{3, 215}_2 ∧  b^{3, 215}_1 ∧  b^{3, 215}_0 ∧ true) 
c  in CNF:
c    -b^{3, 215}_2 ∨ -b^{3, 215}_1 ∨ -b^{3, 215}_0 ∨ false 
c  in DIMACS:
-7034 -7035 -7036  0

c i = 216
c  -2+1 --> -1
c    ( b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧  p_648) -> ( b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0)
c  in CNF:
c    -b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨  b^{3, 217}_2
c    -b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_1
c    -b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨  b^{3, 217}_0
c  in DIMACS:
-7037 -7038  7039 -648  7040 0
-7037 -7038  7039 -648 -7041 0
-7037 -7038  7039 -648  7042 0

c  -1+1 --> 0
c    ( b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0 ∧  p_648) -> (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧ -b^{3, 217}_0)
c  in CNF:
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_2
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_1
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_0
c  in DIMACS:
-7037  7038 -7039 -648 -7040 0
-7037  7038 -7039 -648 -7041 0
-7037  7038 -7039 -648 -7042 0

c  0+1 --> 1
c    (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧  p_648) -> (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0)
c  in CNF:
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_2
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_1
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨  b^{3, 217}_0
c  in DIMACS:
 7037  7038  7039 -648 -7040 0
 7037  7038  7039 -648 -7041 0
 7037  7038  7039 -648  7042 0

c  1+1 --> 2
c    (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0 ∧  p_648) -> (-b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0)
c  in CNF:
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_2
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨  b^{3, 217}_1
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ -p_648 ∨ -b^{3, 217}_0
c  in DIMACS:
 7037  7038 -7039 -648 -7040 0
 7037  7038 -7039 -648  7041 0
 7037  7038 -7039 -648 -7042 0

c  2+1 --> break 
c    (-b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧  p_648) -> break
c  in CNF:
c     b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 7037 -7038  7039 -648 1162 0


c  2-1 --> 1
c    (-b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧ -p_648) -> (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0)
c  in CNF:
c     b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_2
c     b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_1
c     b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨  b^{3, 217}_0
c  in DIMACS:
 7037 -7038  7039  648 -7040 0
 7037 -7038  7039  648 -7041 0
 7037 -7038  7039  648  7042 0

c  1-1 --> 0
c    (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0 ∧ -p_648) -> (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧ -b^{3, 217}_0)
c  in CNF:
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_2
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_1
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_0
c  in DIMACS:
 7037  7038 -7039  648 -7040 0
 7037  7038 -7039  648 -7041 0
 7037  7038 -7039  648 -7042 0

c  0-1 --> -1
c    (-b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧ -p_648) -> ( b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0)
c  in CNF:
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨  b^{3, 217}_2
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_1
c     b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨  b^{3, 217}_0
c  in DIMACS:
 7037  7038  7039  648  7040 0
 7037  7038  7039  648 -7041 0
 7037  7038  7039  648  7042 0

c  -1-1 --> -2
c    ( b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧  b^{3, 216}_0 ∧ -p_648) -> ( b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0)
c  in CNF:
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨  b^{3, 217}_2
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨  b^{3, 217}_1
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨  p_648 ∨ -b^{3, 217}_0
c  in DIMACS:
-7037  7038 -7039  648  7040 0
-7037  7038 -7039  648  7041 0
-7037  7038 -7039  648 -7042 0

c  -2-1 --> break 
c    ( b^{3, 216}_2 ∧  b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨  b^{3, 216}_0 ∨  p_648 ∨ break
c  in DIMACS:
-7037 -7038  7039  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 216}_2 ∧ -b^{3, 216}_1 ∧ -b^{3, 216}_0 ∧ true) 
c  in CNF:
c    -b^{3, 216}_2 ∨  b^{3, 216}_1 ∨  b^{3, 216}_0 ∨ false 
c  in DIMACS:
-7037  7038  7039  0

c  3 does not represent an automaton state.
c    -(-b^{3, 216}_2 ∧  b^{3, 216}_1 ∧  b^{3, 216}_0 ∧ true) 
c  in CNF:
c     b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ false 
c  in DIMACS:
 7037 -7038 -7039  0
c  -3 does not represent an automaton state.
c    -( b^{3, 216}_2 ∧  b^{3, 216}_1 ∧  b^{3, 216}_0 ∧ true) 
c  in CNF:
c    -b^{3, 216}_2 ∨ -b^{3, 216}_1 ∨ -b^{3, 216}_0 ∨ false 
c  in DIMACS:
-7037 -7038 -7039  0

c i = 217
c  -2+1 --> -1
c    ( b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧  p_651) -> ( b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0)
c  in CNF:
c    -b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨  b^{3, 218}_2
c    -b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_1
c    -b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨  b^{3, 218}_0
c  in DIMACS:
-7040 -7041  7042 -651  7043 0
-7040 -7041  7042 -651 -7044 0
-7040 -7041  7042 -651  7045 0

c  -1+1 --> 0
c    ( b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0 ∧  p_651) -> (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧ -b^{3, 218}_0)
c  in CNF:
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_2
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_1
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_0
c  in DIMACS:
-7040  7041 -7042 -651 -7043 0
-7040  7041 -7042 -651 -7044 0
-7040  7041 -7042 -651 -7045 0

c  0+1 --> 1
c    (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧  p_651) -> (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0)
c  in CNF:
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_2
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_1
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨  b^{3, 218}_0
c  in DIMACS:
 7040  7041  7042 -651 -7043 0
 7040  7041  7042 -651 -7044 0
 7040  7041  7042 -651  7045 0

c  1+1 --> 2
c    (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0 ∧  p_651) -> (-b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0)
c  in CNF:
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_2
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨  b^{3, 218}_1
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ -p_651 ∨ -b^{3, 218}_0
c  in DIMACS:
 7040  7041 -7042 -651 -7043 0
 7040  7041 -7042 -651  7044 0
 7040  7041 -7042 -651 -7045 0

c  2+1 --> break 
c    (-b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧  p_651) -> break
c  in CNF:
c     b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 7040 -7041  7042 -651 1162 0


c  2-1 --> 1
c    (-b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧ -p_651) -> (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0)
c  in CNF:
c     b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_2
c     b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_1
c     b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨  b^{3, 218}_0
c  in DIMACS:
 7040 -7041  7042  651 -7043 0
 7040 -7041  7042  651 -7044 0
 7040 -7041  7042  651  7045 0

c  1-1 --> 0
c    (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0 ∧ -p_651) -> (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧ -b^{3, 218}_0)
c  in CNF:
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_2
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_1
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_0
c  in DIMACS:
 7040  7041 -7042  651 -7043 0
 7040  7041 -7042  651 -7044 0
 7040  7041 -7042  651 -7045 0

c  0-1 --> -1
c    (-b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧ -p_651) -> ( b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0)
c  in CNF:
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨  b^{3, 218}_2
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_1
c     b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨  b^{3, 218}_0
c  in DIMACS:
 7040  7041  7042  651  7043 0
 7040  7041  7042  651 -7044 0
 7040  7041  7042  651  7045 0

c  -1-1 --> -2
c    ( b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧  b^{3, 217}_0 ∧ -p_651) -> ( b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0)
c  in CNF:
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨  b^{3, 218}_2
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨  b^{3, 218}_1
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨  p_651 ∨ -b^{3, 218}_0
c  in DIMACS:
-7040  7041 -7042  651  7043 0
-7040  7041 -7042  651  7044 0
-7040  7041 -7042  651 -7045 0

c  -2-1 --> break 
c    ( b^{3, 217}_2 ∧  b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨  b^{3, 217}_0 ∨  p_651 ∨ break
c  in DIMACS:
-7040 -7041  7042  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 217}_2 ∧ -b^{3, 217}_1 ∧ -b^{3, 217}_0 ∧ true) 
c  in CNF:
c    -b^{3, 217}_2 ∨  b^{3, 217}_1 ∨  b^{3, 217}_0 ∨ false 
c  in DIMACS:
-7040  7041  7042  0

c  3 does not represent an automaton state.
c    -(-b^{3, 217}_2 ∧  b^{3, 217}_1 ∧  b^{3, 217}_0 ∧ true) 
c  in CNF:
c     b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ false 
c  in DIMACS:
 7040 -7041 -7042  0
c  -3 does not represent an automaton state.
c    -( b^{3, 217}_2 ∧  b^{3, 217}_1 ∧  b^{3, 217}_0 ∧ true) 
c  in CNF:
c    -b^{3, 217}_2 ∨ -b^{3, 217}_1 ∨ -b^{3, 217}_0 ∨ false 
c  in DIMACS:
-7040 -7041 -7042  0

c i = 218
c  -2+1 --> -1
c    ( b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧  p_654) -> ( b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0)
c  in CNF:
c    -b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨  b^{3, 219}_2
c    -b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_1
c    -b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨  b^{3, 219}_0
c  in DIMACS:
-7043 -7044  7045 -654  7046 0
-7043 -7044  7045 -654 -7047 0
-7043 -7044  7045 -654  7048 0

c  -1+1 --> 0
c    ( b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0 ∧  p_654) -> (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧ -b^{3, 219}_0)
c  in CNF:
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_2
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_1
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_0
c  in DIMACS:
-7043  7044 -7045 -654 -7046 0
-7043  7044 -7045 -654 -7047 0
-7043  7044 -7045 -654 -7048 0

c  0+1 --> 1
c    (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧  p_654) -> (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0)
c  in CNF:
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_2
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_1
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨  b^{3, 219}_0
c  in DIMACS:
 7043  7044  7045 -654 -7046 0
 7043  7044  7045 -654 -7047 0
 7043  7044  7045 -654  7048 0

c  1+1 --> 2
c    (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0 ∧  p_654) -> (-b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0)
c  in CNF:
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_2
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨  b^{3, 219}_1
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ -p_654 ∨ -b^{3, 219}_0
c  in DIMACS:
 7043  7044 -7045 -654 -7046 0
 7043  7044 -7045 -654  7047 0
 7043  7044 -7045 -654 -7048 0

c  2+1 --> break 
c    (-b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧  p_654) -> break
c  in CNF:
c     b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 7043 -7044  7045 -654 1162 0


c  2-1 --> 1
c    (-b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧ -p_654) -> (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0)
c  in CNF:
c     b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_2
c     b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_1
c     b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨  b^{3, 219}_0
c  in DIMACS:
 7043 -7044  7045  654 -7046 0
 7043 -7044  7045  654 -7047 0
 7043 -7044  7045  654  7048 0

c  1-1 --> 0
c    (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0 ∧ -p_654) -> (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧ -b^{3, 219}_0)
c  in CNF:
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_2
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_1
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_0
c  in DIMACS:
 7043  7044 -7045  654 -7046 0
 7043  7044 -7045  654 -7047 0
 7043  7044 -7045  654 -7048 0

c  0-1 --> -1
c    (-b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧ -p_654) -> ( b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0)
c  in CNF:
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨  b^{3, 219}_2
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_1
c     b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨  b^{3, 219}_0
c  in DIMACS:
 7043  7044  7045  654  7046 0
 7043  7044  7045  654 -7047 0
 7043  7044  7045  654  7048 0

c  -1-1 --> -2
c    ( b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧  b^{3, 218}_0 ∧ -p_654) -> ( b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0)
c  in CNF:
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨  b^{3, 219}_2
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨  b^{3, 219}_1
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨  p_654 ∨ -b^{3, 219}_0
c  in DIMACS:
-7043  7044 -7045  654  7046 0
-7043  7044 -7045  654  7047 0
-7043  7044 -7045  654 -7048 0

c  -2-1 --> break 
c    ( b^{3, 218}_2 ∧  b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨  b^{3, 218}_0 ∨  p_654 ∨ break
c  in DIMACS:
-7043 -7044  7045  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 218}_2 ∧ -b^{3, 218}_1 ∧ -b^{3, 218}_0 ∧ true) 
c  in CNF:
c    -b^{3, 218}_2 ∨  b^{3, 218}_1 ∨  b^{3, 218}_0 ∨ false 
c  in DIMACS:
-7043  7044  7045  0

c  3 does not represent an automaton state.
c    -(-b^{3, 218}_2 ∧  b^{3, 218}_1 ∧  b^{3, 218}_0 ∧ true) 
c  in CNF:
c     b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ false 
c  in DIMACS:
 7043 -7044 -7045  0
c  -3 does not represent an automaton state.
c    -( b^{3, 218}_2 ∧  b^{3, 218}_1 ∧  b^{3, 218}_0 ∧ true) 
c  in CNF:
c    -b^{3, 218}_2 ∨ -b^{3, 218}_1 ∨ -b^{3, 218}_0 ∨ false 
c  in DIMACS:
-7043 -7044 -7045  0

c i = 219
c  -2+1 --> -1
c    ( b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧  p_657) -> ( b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0)
c  in CNF:
c    -b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨  b^{3, 220}_2
c    -b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_1
c    -b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨  b^{3, 220}_0
c  in DIMACS:
-7046 -7047  7048 -657  7049 0
-7046 -7047  7048 -657 -7050 0
-7046 -7047  7048 -657  7051 0

c  -1+1 --> 0
c    ( b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0 ∧  p_657) -> (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧ -b^{3, 220}_0)
c  in CNF:
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_2
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_1
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_0
c  in DIMACS:
-7046  7047 -7048 -657 -7049 0
-7046  7047 -7048 -657 -7050 0
-7046  7047 -7048 -657 -7051 0

c  0+1 --> 1
c    (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧  p_657) -> (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0)
c  in CNF:
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_2
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_1
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨  b^{3, 220}_0
c  in DIMACS:
 7046  7047  7048 -657 -7049 0
 7046  7047  7048 -657 -7050 0
 7046  7047  7048 -657  7051 0

c  1+1 --> 2
c    (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0 ∧  p_657) -> (-b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0)
c  in CNF:
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_2
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨  b^{3, 220}_1
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ -p_657 ∨ -b^{3, 220}_0
c  in DIMACS:
 7046  7047 -7048 -657 -7049 0
 7046  7047 -7048 -657  7050 0
 7046  7047 -7048 -657 -7051 0

c  2+1 --> break 
c    (-b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧  p_657) -> break
c  in CNF:
c     b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ -p_657 ∨ break
c  in DIMACS:
 7046 -7047  7048 -657 1162 0


c  2-1 --> 1
c    (-b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧ -p_657) -> (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0)
c  in CNF:
c     b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_2
c     b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_1
c     b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨  b^{3, 220}_0
c  in DIMACS:
 7046 -7047  7048  657 -7049 0
 7046 -7047  7048  657 -7050 0
 7046 -7047  7048  657  7051 0

c  1-1 --> 0
c    (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0 ∧ -p_657) -> (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧ -b^{3, 220}_0)
c  in CNF:
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_2
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_1
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_0
c  in DIMACS:
 7046  7047 -7048  657 -7049 0
 7046  7047 -7048  657 -7050 0
 7046  7047 -7048  657 -7051 0

c  0-1 --> -1
c    (-b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧ -p_657) -> ( b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0)
c  in CNF:
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨  b^{3, 220}_2
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_1
c     b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨  b^{3, 220}_0
c  in DIMACS:
 7046  7047  7048  657  7049 0
 7046  7047  7048  657 -7050 0
 7046  7047  7048  657  7051 0

c  -1-1 --> -2
c    ( b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧  b^{3, 219}_0 ∧ -p_657) -> ( b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0)
c  in CNF:
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨  b^{3, 220}_2
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨  b^{3, 220}_1
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨  p_657 ∨ -b^{3, 220}_0
c  in DIMACS:
-7046  7047 -7048  657  7049 0
-7046  7047 -7048  657  7050 0
-7046  7047 -7048  657 -7051 0

c  -2-1 --> break 
c    ( b^{3, 219}_2 ∧  b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧ -p_657) -> break
c  in CNF:
c    -b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨  b^{3, 219}_0 ∨  p_657 ∨ break
c  in DIMACS:
-7046 -7047  7048  657 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 219}_2 ∧ -b^{3, 219}_1 ∧ -b^{3, 219}_0 ∧ true) 
c  in CNF:
c    -b^{3, 219}_2 ∨  b^{3, 219}_1 ∨  b^{3, 219}_0 ∨ false 
c  in DIMACS:
-7046  7047  7048  0

c  3 does not represent an automaton state.
c    -(-b^{3, 219}_2 ∧  b^{3, 219}_1 ∧  b^{3, 219}_0 ∧ true) 
c  in CNF:
c     b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ false 
c  in DIMACS:
 7046 -7047 -7048  0
c  -3 does not represent an automaton state.
c    -( b^{3, 219}_2 ∧  b^{3, 219}_1 ∧  b^{3, 219}_0 ∧ true) 
c  in CNF:
c    -b^{3, 219}_2 ∨ -b^{3, 219}_1 ∨ -b^{3, 219}_0 ∨ false 
c  in DIMACS:
-7046 -7047 -7048  0

c i = 220
c  -2+1 --> -1
c    ( b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧  p_660) -> ( b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0)
c  in CNF:
c    -b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨  b^{3, 221}_2
c    -b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_1
c    -b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨  b^{3, 221}_0
c  in DIMACS:
-7049 -7050  7051 -660  7052 0
-7049 -7050  7051 -660 -7053 0
-7049 -7050  7051 -660  7054 0

c  -1+1 --> 0
c    ( b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0 ∧  p_660) -> (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧ -b^{3, 221}_0)
c  in CNF:
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_2
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_1
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_0
c  in DIMACS:
-7049  7050 -7051 -660 -7052 0
-7049  7050 -7051 -660 -7053 0
-7049  7050 -7051 -660 -7054 0

c  0+1 --> 1
c    (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧  p_660) -> (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0)
c  in CNF:
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_2
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_1
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨  b^{3, 221}_0
c  in DIMACS:
 7049  7050  7051 -660 -7052 0
 7049  7050  7051 -660 -7053 0
 7049  7050  7051 -660  7054 0

c  1+1 --> 2
c    (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0 ∧  p_660) -> (-b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0)
c  in CNF:
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_2
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨  b^{3, 221}_1
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ -p_660 ∨ -b^{3, 221}_0
c  in DIMACS:
 7049  7050 -7051 -660 -7052 0
 7049  7050 -7051 -660  7053 0
 7049  7050 -7051 -660 -7054 0

c  2+1 --> break 
c    (-b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧  p_660) -> break
c  in CNF:
c     b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 7049 -7050  7051 -660 1162 0


c  2-1 --> 1
c    (-b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧ -p_660) -> (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0)
c  in CNF:
c     b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_2
c     b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_1
c     b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨  b^{3, 221}_0
c  in DIMACS:
 7049 -7050  7051  660 -7052 0
 7049 -7050  7051  660 -7053 0
 7049 -7050  7051  660  7054 0

c  1-1 --> 0
c    (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0 ∧ -p_660) -> (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧ -b^{3, 221}_0)
c  in CNF:
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_2
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_1
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_0
c  in DIMACS:
 7049  7050 -7051  660 -7052 0
 7049  7050 -7051  660 -7053 0
 7049  7050 -7051  660 -7054 0

c  0-1 --> -1
c    (-b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧ -p_660) -> ( b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0)
c  in CNF:
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨  b^{3, 221}_2
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_1
c     b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨  b^{3, 221}_0
c  in DIMACS:
 7049  7050  7051  660  7052 0
 7049  7050  7051  660 -7053 0
 7049  7050  7051  660  7054 0

c  -1-1 --> -2
c    ( b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧  b^{3, 220}_0 ∧ -p_660) -> ( b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0)
c  in CNF:
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨  b^{3, 221}_2
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨  b^{3, 221}_1
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨  p_660 ∨ -b^{3, 221}_0
c  in DIMACS:
-7049  7050 -7051  660  7052 0
-7049  7050 -7051  660  7053 0
-7049  7050 -7051  660 -7054 0

c  -2-1 --> break 
c    ( b^{3, 220}_2 ∧  b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨  b^{3, 220}_0 ∨  p_660 ∨ break
c  in DIMACS:
-7049 -7050  7051  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 220}_2 ∧ -b^{3, 220}_1 ∧ -b^{3, 220}_0 ∧ true) 
c  in CNF:
c    -b^{3, 220}_2 ∨  b^{3, 220}_1 ∨  b^{3, 220}_0 ∨ false 
c  in DIMACS:
-7049  7050  7051  0

c  3 does not represent an automaton state.
c    -(-b^{3, 220}_2 ∧  b^{3, 220}_1 ∧  b^{3, 220}_0 ∧ true) 
c  in CNF:
c     b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ false 
c  in DIMACS:
 7049 -7050 -7051  0
c  -3 does not represent an automaton state.
c    -( b^{3, 220}_2 ∧  b^{3, 220}_1 ∧  b^{3, 220}_0 ∧ true) 
c  in CNF:
c    -b^{3, 220}_2 ∨ -b^{3, 220}_1 ∨ -b^{3, 220}_0 ∨ false 
c  in DIMACS:
-7049 -7050 -7051  0

c i = 221
c  -2+1 --> -1
c    ( b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧  p_663) -> ( b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0)
c  in CNF:
c    -b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨  b^{3, 222}_2
c    -b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_1
c    -b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨  b^{3, 222}_0
c  in DIMACS:
-7052 -7053  7054 -663  7055 0
-7052 -7053  7054 -663 -7056 0
-7052 -7053  7054 -663  7057 0

c  -1+1 --> 0
c    ( b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0 ∧  p_663) -> (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧ -b^{3, 222}_0)
c  in CNF:
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_2
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_1
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_0
c  in DIMACS:
-7052  7053 -7054 -663 -7055 0
-7052  7053 -7054 -663 -7056 0
-7052  7053 -7054 -663 -7057 0

c  0+1 --> 1
c    (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧  p_663) -> (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0)
c  in CNF:
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_2
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_1
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨  b^{3, 222}_0
c  in DIMACS:
 7052  7053  7054 -663 -7055 0
 7052  7053  7054 -663 -7056 0
 7052  7053  7054 -663  7057 0

c  1+1 --> 2
c    (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0 ∧  p_663) -> (-b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0)
c  in CNF:
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_2
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨  b^{3, 222}_1
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ -p_663 ∨ -b^{3, 222}_0
c  in DIMACS:
 7052  7053 -7054 -663 -7055 0
 7052  7053 -7054 -663  7056 0
 7052  7053 -7054 -663 -7057 0

c  2+1 --> break 
c    (-b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧  p_663) -> break
c  in CNF:
c     b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 7052 -7053  7054 -663 1162 0


c  2-1 --> 1
c    (-b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧ -p_663) -> (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0)
c  in CNF:
c     b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_2
c     b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_1
c     b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨  b^{3, 222}_0
c  in DIMACS:
 7052 -7053  7054  663 -7055 0
 7052 -7053  7054  663 -7056 0
 7052 -7053  7054  663  7057 0

c  1-1 --> 0
c    (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0 ∧ -p_663) -> (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧ -b^{3, 222}_0)
c  in CNF:
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_2
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_1
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_0
c  in DIMACS:
 7052  7053 -7054  663 -7055 0
 7052  7053 -7054  663 -7056 0
 7052  7053 -7054  663 -7057 0

c  0-1 --> -1
c    (-b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧ -p_663) -> ( b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0)
c  in CNF:
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨  b^{3, 222}_2
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_1
c     b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨  b^{3, 222}_0
c  in DIMACS:
 7052  7053  7054  663  7055 0
 7052  7053  7054  663 -7056 0
 7052  7053  7054  663  7057 0

c  -1-1 --> -2
c    ( b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧  b^{3, 221}_0 ∧ -p_663) -> ( b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0)
c  in CNF:
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨  b^{3, 222}_2
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨  b^{3, 222}_1
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨  p_663 ∨ -b^{3, 222}_0
c  in DIMACS:
-7052  7053 -7054  663  7055 0
-7052  7053 -7054  663  7056 0
-7052  7053 -7054  663 -7057 0

c  -2-1 --> break 
c    ( b^{3, 221}_2 ∧  b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨  b^{3, 221}_0 ∨  p_663 ∨ break
c  in DIMACS:
-7052 -7053  7054  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 221}_2 ∧ -b^{3, 221}_1 ∧ -b^{3, 221}_0 ∧ true) 
c  in CNF:
c    -b^{3, 221}_2 ∨  b^{3, 221}_1 ∨  b^{3, 221}_0 ∨ false 
c  in DIMACS:
-7052  7053  7054  0

c  3 does not represent an automaton state.
c    -(-b^{3, 221}_2 ∧  b^{3, 221}_1 ∧  b^{3, 221}_0 ∧ true) 
c  in CNF:
c     b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ false 
c  in DIMACS:
 7052 -7053 -7054  0
c  -3 does not represent an automaton state.
c    -( b^{3, 221}_2 ∧  b^{3, 221}_1 ∧  b^{3, 221}_0 ∧ true) 
c  in CNF:
c    -b^{3, 221}_2 ∨ -b^{3, 221}_1 ∨ -b^{3, 221}_0 ∨ false 
c  in DIMACS:
-7052 -7053 -7054  0

c i = 222
c  -2+1 --> -1
c    ( b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧  p_666) -> ( b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0)
c  in CNF:
c    -b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨  b^{3, 223}_2
c    -b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_1
c    -b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨  b^{3, 223}_0
c  in DIMACS:
-7055 -7056  7057 -666  7058 0
-7055 -7056  7057 -666 -7059 0
-7055 -7056  7057 -666  7060 0

c  -1+1 --> 0
c    ( b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0 ∧  p_666) -> (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧ -b^{3, 223}_0)
c  in CNF:
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_2
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_1
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_0
c  in DIMACS:
-7055  7056 -7057 -666 -7058 0
-7055  7056 -7057 -666 -7059 0
-7055  7056 -7057 -666 -7060 0

c  0+1 --> 1
c    (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧  p_666) -> (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0)
c  in CNF:
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_2
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_1
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨  b^{3, 223}_0
c  in DIMACS:
 7055  7056  7057 -666 -7058 0
 7055  7056  7057 -666 -7059 0
 7055  7056  7057 -666  7060 0

c  1+1 --> 2
c    (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0 ∧  p_666) -> (-b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0)
c  in CNF:
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_2
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨  b^{3, 223}_1
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ -p_666 ∨ -b^{3, 223}_0
c  in DIMACS:
 7055  7056 -7057 -666 -7058 0
 7055  7056 -7057 -666  7059 0
 7055  7056 -7057 -666 -7060 0

c  2+1 --> break 
c    (-b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧  p_666) -> break
c  in CNF:
c     b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 7055 -7056  7057 -666 1162 0


c  2-1 --> 1
c    (-b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧ -p_666) -> (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0)
c  in CNF:
c     b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_2
c     b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_1
c     b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨  b^{3, 223}_0
c  in DIMACS:
 7055 -7056  7057  666 -7058 0
 7055 -7056  7057  666 -7059 0
 7055 -7056  7057  666  7060 0

c  1-1 --> 0
c    (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0 ∧ -p_666) -> (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧ -b^{3, 223}_0)
c  in CNF:
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_2
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_1
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_0
c  in DIMACS:
 7055  7056 -7057  666 -7058 0
 7055  7056 -7057  666 -7059 0
 7055  7056 -7057  666 -7060 0

c  0-1 --> -1
c    (-b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧ -p_666) -> ( b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0)
c  in CNF:
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨  b^{3, 223}_2
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_1
c     b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨  b^{3, 223}_0
c  in DIMACS:
 7055  7056  7057  666  7058 0
 7055  7056  7057  666 -7059 0
 7055  7056  7057  666  7060 0

c  -1-1 --> -2
c    ( b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧  b^{3, 222}_0 ∧ -p_666) -> ( b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0)
c  in CNF:
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨  b^{3, 223}_2
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨  b^{3, 223}_1
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨  p_666 ∨ -b^{3, 223}_0
c  in DIMACS:
-7055  7056 -7057  666  7058 0
-7055  7056 -7057  666  7059 0
-7055  7056 -7057  666 -7060 0

c  -2-1 --> break 
c    ( b^{3, 222}_2 ∧  b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨  b^{3, 222}_0 ∨  p_666 ∨ break
c  in DIMACS:
-7055 -7056  7057  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 222}_2 ∧ -b^{3, 222}_1 ∧ -b^{3, 222}_0 ∧ true) 
c  in CNF:
c    -b^{3, 222}_2 ∨  b^{3, 222}_1 ∨  b^{3, 222}_0 ∨ false 
c  in DIMACS:
-7055  7056  7057  0

c  3 does not represent an automaton state.
c    -(-b^{3, 222}_2 ∧  b^{3, 222}_1 ∧  b^{3, 222}_0 ∧ true) 
c  in CNF:
c     b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ false 
c  in DIMACS:
 7055 -7056 -7057  0
c  -3 does not represent an automaton state.
c    -( b^{3, 222}_2 ∧  b^{3, 222}_1 ∧  b^{3, 222}_0 ∧ true) 
c  in CNF:
c    -b^{3, 222}_2 ∨ -b^{3, 222}_1 ∨ -b^{3, 222}_0 ∨ false 
c  in DIMACS:
-7055 -7056 -7057  0

c i = 223
c  -2+1 --> -1
c    ( b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧  p_669) -> ( b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0)
c  in CNF:
c    -b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨  b^{3, 224}_2
c    -b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_1
c    -b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨  b^{3, 224}_0
c  in DIMACS:
-7058 -7059  7060 -669  7061 0
-7058 -7059  7060 -669 -7062 0
-7058 -7059  7060 -669  7063 0

c  -1+1 --> 0
c    ( b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0 ∧  p_669) -> (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧ -b^{3, 224}_0)
c  in CNF:
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_2
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_1
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_0
c  in DIMACS:
-7058  7059 -7060 -669 -7061 0
-7058  7059 -7060 -669 -7062 0
-7058  7059 -7060 -669 -7063 0

c  0+1 --> 1
c    (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧  p_669) -> (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0)
c  in CNF:
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_2
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_1
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨  b^{3, 224}_0
c  in DIMACS:
 7058  7059  7060 -669 -7061 0
 7058  7059  7060 -669 -7062 0
 7058  7059  7060 -669  7063 0

c  1+1 --> 2
c    (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0 ∧  p_669) -> (-b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0)
c  in CNF:
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_2
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨  b^{3, 224}_1
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ -p_669 ∨ -b^{3, 224}_0
c  in DIMACS:
 7058  7059 -7060 -669 -7061 0
 7058  7059 -7060 -669  7062 0
 7058  7059 -7060 -669 -7063 0

c  2+1 --> break 
c    (-b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧  p_669) -> break
c  in CNF:
c     b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ -p_669 ∨ break
c  in DIMACS:
 7058 -7059  7060 -669 1162 0


c  2-1 --> 1
c    (-b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧ -p_669) -> (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0)
c  in CNF:
c     b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_2
c     b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_1
c     b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨  b^{3, 224}_0
c  in DIMACS:
 7058 -7059  7060  669 -7061 0
 7058 -7059  7060  669 -7062 0
 7058 -7059  7060  669  7063 0

c  1-1 --> 0
c    (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0 ∧ -p_669) -> (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧ -b^{3, 224}_0)
c  in CNF:
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_2
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_1
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_0
c  in DIMACS:
 7058  7059 -7060  669 -7061 0
 7058  7059 -7060  669 -7062 0
 7058  7059 -7060  669 -7063 0

c  0-1 --> -1
c    (-b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧ -p_669) -> ( b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0)
c  in CNF:
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨  b^{3, 224}_2
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_1
c     b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨  b^{3, 224}_0
c  in DIMACS:
 7058  7059  7060  669  7061 0
 7058  7059  7060  669 -7062 0
 7058  7059  7060  669  7063 0

c  -1-1 --> -2
c    ( b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧  b^{3, 223}_0 ∧ -p_669) -> ( b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0)
c  in CNF:
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨  b^{3, 224}_2
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨  b^{3, 224}_1
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨  p_669 ∨ -b^{3, 224}_0
c  in DIMACS:
-7058  7059 -7060  669  7061 0
-7058  7059 -7060  669  7062 0
-7058  7059 -7060  669 -7063 0

c  -2-1 --> break 
c    ( b^{3, 223}_2 ∧  b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧ -p_669) -> break
c  in CNF:
c    -b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨  b^{3, 223}_0 ∨  p_669 ∨ break
c  in DIMACS:
-7058 -7059  7060  669 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 223}_2 ∧ -b^{3, 223}_1 ∧ -b^{3, 223}_0 ∧ true) 
c  in CNF:
c    -b^{3, 223}_2 ∨  b^{3, 223}_1 ∨  b^{3, 223}_0 ∨ false 
c  in DIMACS:
-7058  7059  7060  0

c  3 does not represent an automaton state.
c    -(-b^{3, 223}_2 ∧  b^{3, 223}_1 ∧  b^{3, 223}_0 ∧ true) 
c  in CNF:
c     b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ false 
c  in DIMACS:
 7058 -7059 -7060  0
c  -3 does not represent an automaton state.
c    -( b^{3, 223}_2 ∧  b^{3, 223}_1 ∧  b^{3, 223}_0 ∧ true) 
c  in CNF:
c    -b^{3, 223}_2 ∨ -b^{3, 223}_1 ∨ -b^{3, 223}_0 ∨ false 
c  in DIMACS:
-7058 -7059 -7060  0

c i = 224
c  -2+1 --> -1
c    ( b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧  p_672) -> ( b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0)
c  in CNF:
c    -b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨  b^{3, 225}_2
c    -b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_1
c    -b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨  b^{3, 225}_0
c  in DIMACS:
-7061 -7062  7063 -672  7064 0
-7061 -7062  7063 -672 -7065 0
-7061 -7062  7063 -672  7066 0

c  -1+1 --> 0
c    ( b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0 ∧  p_672) -> (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧ -b^{3, 225}_0)
c  in CNF:
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_2
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_1
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_0
c  in DIMACS:
-7061  7062 -7063 -672 -7064 0
-7061  7062 -7063 -672 -7065 0
-7061  7062 -7063 -672 -7066 0

c  0+1 --> 1
c    (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧  p_672) -> (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0)
c  in CNF:
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_2
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_1
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨  b^{3, 225}_0
c  in DIMACS:
 7061  7062  7063 -672 -7064 0
 7061  7062  7063 -672 -7065 0
 7061  7062  7063 -672  7066 0

c  1+1 --> 2
c    (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0 ∧  p_672) -> (-b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0)
c  in CNF:
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_2
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨  b^{3, 225}_1
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ -p_672 ∨ -b^{3, 225}_0
c  in DIMACS:
 7061  7062 -7063 -672 -7064 0
 7061  7062 -7063 -672  7065 0
 7061  7062 -7063 -672 -7066 0

c  2+1 --> break 
c    (-b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧  p_672) -> break
c  in CNF:
c     b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 7061 -7062  7063 -672 1162 0


c  2-1 --> 1
c    (-b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧ -p_672) -> (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0)
c  in CNF:
c     b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_2
c     b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_1
c     b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨  b^{3, 225}_0
c  in DIMACS:
 7061 -7062  7063  672 -7064 0
 7061 -7062  7063  672 -7065 0
 7061 -7062  7063  672  7066 0

c  1-1 --> 0
c    (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0 ∧ -p_672) -> (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧ -b^{3, 225}_0)
c  in CNF:
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_2
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_1
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_0
c  in DIMACS:
 7061  7062 -7063  672 -7064 0
 7061  7062 -7063  672 -7065 0
 7061  7062 -7063  672 -7066 0

c  0-1 --> -1
c    (-b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧ -p_672) -> ( b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0)
c  in CNF:
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨  b^{3, 225}_2
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_1
c     b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨  b^{3, 225}_0
c  in DIMACS:
 7061  7062  7063  672  7064 0
 7061  7062  7063  672 -7065 0
 7061  7062  7063  672  7066 0

c  -1-1 --> -2
c    ( b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧  b^{3, 224}_0 ∧ -p_672) -> ( b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0)
c  in CNF:
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨  b^{3, 225}_2
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨  b^{3, 225}_1
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨  p_672 ∨ -b^{3, 225}_0
c  in DIMACS:
-7061  7062 -7063  672  7064 0
-7061  7062 -7063  672  7065 0
-7061  7062 -7063  672 -7066 0

c  -2-1 --> break 
c    ( b^{3, 224}_2 ∧  b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨  b^{3, 224}_0 ∨  p_672 ∨ break
c  in DIMACS:
-7061 -7062  7063  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 224}_2 ∧ -b^{3, 224}_1 ∧ -b^{3, 224}_0 ∧ true) 
c  in CNF:
c    -b^{3, 224}_2 ∨  b^{3, 224}_1 ∨  b^{3, 224}_0 ∨ false 
c  in DIMACS:
-7061  7062  7063  0

c  3 does not represent an automaton state.
c    -(-b^{3, 224}_2 ∧  b^{3, 224}_1 ∧  b^{3, 224}_0 ∧ true) 
c  in CNF:
c     b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ false 
c  in DIMACS:
 7061 -7062 -7063  0
c  -3 does not represent an automaton state.
c    -( b^{3, 224}_2 ∧  b^{3, 224}_1 ∧  b^{3, 224}_0 ∧ true) 
c  in CNF:
c    -b^{3, 224}_2 ∨ -b^{3, 224}_1 ∨ -b^{3, 224}_0 ∨ false 
c  in DIMACS:
-7061 -7062 -7063  0

c i = 225
c  -2+1 --> -1
c    ( b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧  p_675) -> ( b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0)
c  in CNF:
c    -b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨  b^{3, 226}_2
c    -b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_1
c    -b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨  b^{3, 226}_0
c  in DIMACS:
-7064 -7065  7066 -675  7067 0
-7064 -7065  7066 -675 -7068 0
-7064 -7065  7066 -675  7069 0

c  -1+1 --> 0
c    ( b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0 ∧  p_675) -> (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧ -b^{3, 226}_0)
c  in CNF:
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_2
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_1
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_0
c  in DIMACS:
-7064  7065 -7066 -675 -7067 0
-7064  7065 -7066 -675 -7068 0
-7064  7065 -7066 -675 -7069 0

c  0+1 --> 1
c    (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧  p_675) -> (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0)
c  in CNF:
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_2
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_1
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨  b^{3, 226}_0
c  in DIMACS:
 7064  7065  7066 -675 -7067 0
 7064  7065  7066 -675 -7068 0
 7064  7065  7066 -675  7069 0

c  1+1 --> 2
c    (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0 ∧  p_675) -> (-b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0)
c  in CNF:
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_2
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨  b^{3, 226}_1
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ -p_675 ∨ -b^{3, 226}_0
c  in DIMACS:
 7064  7065 -7066 -675 -7067 0
 7064  7065 -7066 -675  7068 0
 7064  7065 -7066 -675 -7069 0

c  2+1 --> break 
c    (-b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧  p_675) -> break
c  in CNF:
c     b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 7064 -7065  7066 -675 1162 0


c  2-1 --> 1
c    (-b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧ -p_675) -> (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0)
c  in CNF:
c     b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_2
c     b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_1
c     b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨  b^{3, 226}_0
c  in DIMACS:
 7064 -7065  7066  675 -7067 0
 7064 -7065  7066  675 -7068 0
 7064 -7065  7066  675  7069 0

c  1-1 --> 0
c    (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0 ∧ -p_675) -> (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧ -b^{3, 226}_0)
c  in CNF:
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_2
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_1
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_0
c  in DIMACS:
 7064  7065 -7066  675 -7067 0
 7064  7065 -7066  675 -7068 0
 7064  7065 -7066  675 -7069 0

c  0-1 --> -1
c    (-b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧ -p_675) -> ( b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0)
c  in CNF:
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨  b^{3, 226}_2
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_1
c     b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨  b^{3, 226}_0
c  in DIMACS:
 7064  7065  7066  675  7067 0
 7064  7065  7066  675 -7068 0
 7064  7065  7066  675  7069 0

c  -1-1 --> -2
c    ( b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧  b^{3, 225}_0 ∧ -p_675) -> ( b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0)
c  in CNF:
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨  b^{3, 226}_2
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨  b^{3, 226}_1
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨  p_675 ∨ -b^{3, 226}_0
c  in DIMACS:
-7064  7065 -7066  675  7067 0
-7064  7065 -7066  675  7068 0
-7064  7065 -7066  675 -7069 0

c  -2-1 --> break 
c    ( b^{3, 225}_2 ∧  b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨  b^{3, 225}_0 ∨  p_675 ∨ break
c  in DIMACS:
-7064 -7065  7066  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 225}_2 ∧ -b^{3, 225}_1 ∧ -b^{3, 225}_0 ∧ true) 
c  in CNF:
c    -b^{3, 225}_2 ∨  b^{3, 225}_1 ∨  b^{3, 225}_0 ∨ false 
c  in DIMACS:
-7064  7065  7066  0

c  3 does not represent an automaton state.
c    -(-b^{3, 225}_2 ∧  b^{3, 225}_1 ∧  b^{3, 225}_0 ∧ true) 
c  in CNF:
c     b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ false 
c  in DIMACS:
 7064 -7065 -7066  0
c  -3 does not represent an automaton state.
c    -( b^{3, 225}_2 ∧  b^{3, 225}_1 ∧  b^{3, 225}_0 ∧ true) 
c  in CNF:
c    -b^{3, 225}_2 ∨ -b^{3, 225}_1 ∨ -b^{3, 225}_0 ∨ false 
c  in DIMACS:
-7064 -7065 -7066  0

c i = 226
c  -2+1 --> -1
c    ( b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧  p_678) -> ( b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0)
c  in CNF:
c    -b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨  b^{3, 227}_2
c    -b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_1
c    -b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨  b^{3, 227}_0
c  in DIMACS:
-7067 -7068  7069 -678  7070 0
-7067 -7068  7069 -678 -7071 0
-7067 -7068  7069 -678  7072 0

c  -1+1 --> 0
c    ( b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0 ∧  p_678) -> (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧ -b^{3, 227}_0)
c  in CNF:
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_2
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_1
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_0
c  in DIMACS:
-7067  7068 -7069 -678 -7070 0
-7067  7068 -7069 -678 -7071 0
-7067  7068 -7069 -678 -7072 0

c  0+1 --> 1
c    (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧  p_678) -> (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0)
c  in CNF:
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_2
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_1
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨  b^{3, 227}_0
c  in DIMACS:
 7067  7068  7069 -678 -7070 0
 7067  7068  7069 -678 -7071 0
 7067  7068  7069 -678  7072 0

c  1+1 --> 2
c    (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0 ∧  p_678) -> (-b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0)
c  in CNF:
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_2
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨  b^{3, 227}_1
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ -p_678 ∨ -b^{3, 227}_0
c  in DIMACS:
 7067  7068 -7069 -678 -7070 0
 7067  7068 -7069 -678  7071 0
 7067  7068 -7069 -678 -7072 0

c  2+1 --> break 
c    (-b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧  p_678) -> break
c  in CNF:
c     b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 7067 -7068  7069 -678 1162 0


c  2-1 --> 1
c    (-b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧ -p_678) -> (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0)
c  in CNF:
c     b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_2
c     b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_1
c     b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨  b^{3, 227}_0
c  in DIMACS:
 7067 -7068  7069  678 -7070 0
 7067 -7068  7069  678 -7071 0
 7067 -7068  7069  678  7072 0

c  1-1 --> 0
c    (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0 ∧ -p_678) -> (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧ -b^{3, 227}_0)
c  in CNF:
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_2
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_1
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_0
c  in DIMACS:
 7067  7068 -7069  678 -7070 0
 7067  7068 -7069  678 -7071 0
 7067  7068 -7069  678 -7072 0

c  0-1 --> -1
c    (-b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧ -p_678) -> ( b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0)
c  in CNF:
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨  b^{3, 227}_2
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_1
c     b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨  b^{3, 227}_0
c  in DIMACS:
 7067  7068  7069  678  7070 0
 7067  7068  7069  678 -7071 0
 7067  7068  7069  678  7072 0

c  -1-1 --> -2
c    ( b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧  b^{3, 226}_0 ∧ -p_678) -> ( b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0)
c  in CNF:
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨  b^{3, 227}_2
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨  b^{3, 227}_1
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨  p_678 ∨ -b^{3, 227}_0
c  in DIMACS:
-7067  7068 -7069  678  7070 0
-7067  7068 -7069  678  7071 0
-7067  7068 -7069  678 -7072 0

c  -2-1 --> break 
c    ( b^{3, 226}_2 ∧  b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨  b^{3, 226}_0 ∨  p_678 ∨ break
c  in DIMACS:
-7067 -7068  7069  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 226}_2 ∧ -b^{3, 226}_1 ∧ -b^{3, 226}_0 ∧ true) 
c  in CNF:
c    -b^{3, 226}_2 ∨  b^{3, 226}_1 ∨  b^{3, 226}_0 ∨ false 
c  in DIMACS:
-7067  7068  7069  0

c  3 does not represent an automaton state.
c    -(-b^{3, 226}_2 ∧  b^{3, 226}_1 ∧  b^{3, 226}_0 ∧ true) 
c  in CNF:
c     b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ false 
c  in DIMACS:
 7067 -7068 -7069  0
c  -3 does not represent an automaton state.
c    -( b^{3, 226}_2 ∧  b^{3, 226}_1 ∧  b^{3, 226}_0 ∧ true) 
c  in CNF:
c    -b^{3, 226}_2 ∨ -b^{3, 226}_1 ∨ -b^{3, 226}_0 ∨ false 
c  in DIMACS:
-7067 -7068 -7069  0

c i = 227
c  -2+1 --> -1
c    ( b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧  p_681) -> ( b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0)
c  in CNF:
c    -b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨  b^{3, 228}_2
c    -b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_1
c    -b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨  b^{3, 228}_0
c  in DIMACS:
-7070 -7071  7072 -681  7073 0
-7070 -7071  7072 -681 -7074 0
-7070 -7071  7072 -681  7075 0

c  -1+1 --> 0
c    ( b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0 ∧  p_681) -> (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧ -b^{3, 228}_0)
c  in CNF:
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_2
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_1
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_0
c  in DIMACS:
-7070  7071 -7072 -681 -7073 0
-7070  7071 -7072 -681 -7074 0
-7070  7071 -7072 -681 -7075 0

c  0+1 --> 1
c    (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧  p_681) -> (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0)
c  in CNF:
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_2
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_1
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨  b^{3, 228}_0
c  in DIMACS:
 7070  7071  7072 -681 -7073 0
 7070  7071  7072 -681 -7074 0
 7070  7071  7072 -681  7075 0

c  1+1 --> 2
c    (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0 ∧  p_681) -> (-b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0)
c  in CNF:
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_2
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨  b^{3, 228}_1
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ -p_681 ∨ -b^{3, 228}_0
c  in DIMACS:
 7070  7071 -7072 -681 -7073 0
 7070  7071 -7072 -681  7074 0
 7070  7071 -7072 -681 -7075 0

c  2+1 --> break 
c    (-b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧  p_681) -> break
c  in CNF:
c     b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ -p_681 ∨ break
c  in DIMACS:
 7070 -7071  7072 -681 1162 0


c  2-1 --> 1
c    (-b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧ -p_681) -> (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0)
c  in CNF:
c     b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_2
c     b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_1
c     b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨  b^{3, 228}_0
c  in DIMACS:
 7070 -7071  7072  681 -7073 0
 7070 -7071  7072  681 -7074 0
 7070 -7071  7072  681  7075 0

c  1-1 --> 0
c    (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0 ∧ -p_681) -> (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧ -b^{3, 228}_0)
c  in CNF:
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_2
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_1
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_0
c  in DIMACS:
 7070  7071 -7072  681 -7073 0
 7070  7071 -7072  681 -7074 0
 7070  7071 -7072  681 -7075 0

c  0-1 --> -1
c    (-b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧ -p_681) -> ( b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0)
c  in CNF:
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨  b^{3, 228}_2
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_1
c     b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨  b^{3, 228}_0
c  in DIMACS:
 7070  7071  7072  681  7073 0
 7070  7071  7072  681 -7074 0
 7070  7071  7072  681  7075 0

c  -1-1 --> -2
c    ( b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧  b^{3, 227}_0 ∧ -p_681) -> ( b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0)
c  in CNF:
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨  b^{3, 228}_2
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨  b^{3, 228}_1
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨  p_681 ∨ -b^{3, 228}_0
c  in DIMACS:
-7070  7071 -7072  681  7073 0
-7070  7071 -7072  681  7074 0
-7070  7071 -7072  681 -7075 0

c  -2-1 --> break 
c    ( b^{3, 227}_2 ∧  b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧ -p_681) -> break
c  in CNF:
c    -b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨  b^{3, 227}_0 ∨  p_681 ∨ break
c  in DIMACS:
-7070 -7071  7072  681 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 227}_2 ∧ -b^{3, 227}_1 ∧ -b^{3, 227}_0 ∧ true) 
c  in CNF:
c    -b^{3, 227}_2 ∨  b^{3, 227}_1 ∨  b^{3, 227}_0 ∨ false 
c  in DIMACS:
-7070  7071  7072  0

c  3 does not represent an automaton state.
c    -(-b^{3, 227}_2 ∧  b^{3, 227}_1 ∧  b^{3, 227}_0 ∧ true) 
c  in CNF:
c     b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ false 
c  in DIMACS:
 7070 -7071 -7072  0
c  -3 does not represent an automaton state.
c    -( b^{3, 227}_2 ∧  b^{3, 227}_1 ∧  b^{3, 227}_0 ∧ true) 
c  in CNF:
c    -b^{3, 227}_2 ∨ -b^{3, 227}_1 ∨ -b^{3, 227}_0 ∨ false 
c  in DIMACS:
-7070 -7071 -7072  0

c i = 228
c  -2+1 --> -1
c    ( b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧  p_684) -> ( b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0)
c  in CNF:
c    -b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨  b^{3, 229}_2
c    -b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_1
c    -b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨  b^{3, 229}_0
c  in DIMACS:
-7073 -7074  7075 -684  7076 0
-7073 -7074  7075 -684 -7077 0
-7073 -7074  7075 -684  7078 0

c  -1+1 --> 0
c    ( b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0 ∧  p_684) -> (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧ -b^{3, 229}_0)
c  in CNF:
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_2
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_1
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_0
c  in DIMACS:
-7073  7074 -7075 -684 -7076 0
-7073  7074 -7075 -684 -7077 0
-7073  7074 -7075 -684 -7078 0

c  0+1 --> 1
c    (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧  p_684) -> (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0)
c  in CNF:
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_2
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_1
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨  b^{3, 229}_0
c  in DIMACS:
 7073  7074  7075 -684 -7076 0
 7073  7074  7075 -684 -7077 0
 7073  7074  7075 -684  7078 0

c  1+1 --> 2
c    (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0 ∧  p_684) -> (-b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0)
c  in CNF:
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_2
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨  b^{3, 229}_1
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ -p_684 ∨ -b^{3, 229}_0
c  in DIMACS:
 7073  7074 -7075 -684 -7076 0
 7073  7074 -7075 -684  7077 0
 7073  7074 -7075 -684 -7078 0

c  2+1 --> break 
c    (-b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧  p_684) -> break
c  in CNF:
c     b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 7073 -7074  7075 -684 1162 0


c  2-1 --> 1
c    (-b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧ -p_684) -> (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0)
c  in CNF:
c     b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_2
c     b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_1
c     b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨  b^{3, 229}_0
c  in DIMACS:
 7073 -7074  7075  684 -7076 0
 7073 -7074  7075  684 -7077 0
 7073 -7074  7075  684  7078 0

c  1-1 --> 0
c    (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0 ∧ -p_684) -> (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧ -b^{3, 229}_0)
c  in CNF:
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_2
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_1
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_0
c  in DIMACS:
 7073  7074 -7075  684 -7076 0
 7073  7074 -7075  684 -7077 0
 7073  7074 -7075  684 -7078 0

c  0-1 --> -1
c    (-b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧ -p_684) -> ( b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0)
c  in CNF:
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨  b^{3, 229}_2
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_1
c     b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨  b^{3, 229}_0
c  in DIMACS:
 7073  7074  7075  684  7076 0
 7073  7074  7075  684 -7077 0
 7073  7074  7075  684  7078 0

c  -1-1 --> -2
c    ( b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧  b^{3, 228}_0 ∧ -p_684) -> ( b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0)
c  in CNF:
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨  b^{3, 229}_2
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨  b^{3, 229}_1
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨  p_684 ∨ -b^{3, 229}_0
c  in DIMACS:
-7073  7074 -7075  684  7076 0
-7073  7074 -7075  684  7077 0
-7073  7074 -7075  684 -7078 0

c  -2-1 --> break 
c    ( b^{3, 228}_2 ∧  b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨  b^{3, 228}_0 ∨  p_684 ∨ break
c  in DIMACS:
-7073 -7074  7075  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 228}_2 ∧ -b^{3, 228}_1 ∧ -b^{3, 228}_0 ∧ true) 
c  in CNF:
c    -b^{3, 228}_2 ∨  b^{3, 228}_1 ∨  b^{3, 228}_0 ∨ false 
c  in DIMACS:
-7073  7074  7075  0

c  3 does not represent an automaton state.
c    -(-b^{3, 228}_2 ∧  b^{3, 228}_1 ∧  b^{3, 228}_0 ∧ true) 
c  in CNF:
c     b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ false 
c  in DIMACS:
 7073 -7074 -7075  0
c  -3 does not represent an automaton state.
c    -( b^{3, 228}_2 ∧  b^{3, 228}_1 ∧  b^{3, 228}_0 ∧ true) 
c  in CNF:
c    -b^{3, 228}_2 ∨ -b^{3, 228}_1 ∨ -b^{3, 228}_0 ∨ false 
c  in DIMACS:
-7073 -7074 -7075  0

c i = 229
c  -2+1 --> -1
c    ( b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧  p_687) -> ( b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0)
c  in CNF:
c    -b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨  b^{3, 230}_2
c    -b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_1
c    -b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨  b^{3, 230}_0
c  in DIMACS:
-7076 -7077  7078 -687  7079 0
-7076 -7077  7078 -687 -7080 0
-7076 -7077  7078 -687  7081 0

c  -1+1 --> 0
c    ( b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0 ∧  p_687) -> (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧ -b^{3, 230}_0)
c  in CNF:
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_2
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_1
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_0
c  in DIMACS:
-7076  7077 -7078 -687 -7079 0
-7076  7077 -7078 -687 -7080 0
-7076  7077 -7078 -687 -7081 0

c  0+1 --> 1
c    (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧  p_687) -> (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0)
c  in CNF:
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_2
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_1
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨  b^{3, 230}_0
c  in DIMACS:
 7076  7077  7078 -687 -7079 0
 7076  7077  7078 -687 -7080 0
 7076  7077  7078 -687  7081 0

c  1+1 --> 2
c    (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0 ∧  p_687) -> (-b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0)
c  in CNF:
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_2
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨  b^{3, 230}_1
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ -p_687 ∨ -b^{3, 230}_0
c  in DIMACS:
 7076  7077 -7078 -687 -7079 0
 7076  7077 -7078 -687  7080 0
 7076  7077 -7078 -687 -7081 0

c  2+1 --> break 
c    (-b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧  p_687) -> break
c  in CNF:
c     b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ -p_687 ∨ break
c  in DIMACS:
 7076 -7077  7078 -687 1162 0


c  2-1 --> 1
c    (-b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧ -p_687) -> (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0)
c  in CNF:
c     b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_2
c     b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_1
c     b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨  b^{3, 230}_0
c  in DIMACS:
 7076 -7077  7078  687 -7079 0
 7076 -7077  7078  687 -7080 0
 7076 -7077  7078  687  7081 0

c  1-1 --> 0
c    (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0 ∧ -p_687) -> (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧ -b^{3, 230}_0)
c  in CNF:
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_2
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_1
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_0
c  in DIMACS:
 7076  7077 -7078  687 -7079 0
 7076  7077 -7078  687 -7080 0
 7076  7077 -7078  687 -7081 0

c  0-1 --> -1
c    (-b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧ -p_687) -> ( b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0)
c  in CNF:
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨  b^{3, 230}_2
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_1
c     b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨  b^{3, 230}_0
c  in DIMACS:
 7076  7077  7078  687  7079 0
 7076  7077  7078  687 -7080 0
 7076  7077  7078  687  7081 0

c  -1-1 --> -2
c    ( b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧  b^{3, 229}_0 ∧ -p_687) -> ( b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0)
c  in CNF:
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨  b^{3, 230}_2
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨  b^{3, 230}_1
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨  p_687 ∨ -b^{3, 230}_0
c  in DIMACS:
-7076  7077 -7078  687  7079 0
-7076  7077 -7078  687  7080 0
-7076  7077 -7078  687 -7081 0

c  -2-1 --> break 
c    ( b^{3, 229}_2 ∧  b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧ -p_687) -> break
c  in CNF:
c    -b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨  b^{3, 229}_0 ∨  p_687 ∨ break
c  in DIMACS:
-7076 -7077  7078  687 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 229}_2 ∧ -b^{3, 229}_1 ∧ -b^{3, 229}_0 ∧ true) 
c  in CNF:
c    -b^{3, 229}_2 ∨  b^{3, 229}_1 ∨  b^{3, 229}_0 ∨ false 
c  in DIMACS:
-7076  7077  7078  0

c  3 does not represent an automaton state.
c    -(-b^{3, 229}_2 ∧  b^{3, 229}_1 ∧  b^{3, 229}_0 ∧ true) 
c  in CNF:
c     b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ false 
c  in DIMACS:
 7076 -7077 -7078  0
c  -3 does not represent an automaton state.
c    -( b^{3, 229}_2 ∧  b^{3, 229}_1 ∧  b^{3, 229}_0 ∧ true) 
c  in CNF:
c    -b^{3, 229}_2 ∨ -b^{3, 229}_1 ∨ -b^{3, 229}_0 ∨ false 
c  in DIMACS:
-7076 -7077 -7078  0

c i = 230
c  -2+1 --> -1
c    ( b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧  p_690) -> ( b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0)
c  in CNF:
c    -b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨  b^{3, 231}_2
c    -b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_1
c    -b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨  b^{3, 231}_0
c  in DIMACS:
-7079 -7080  7081 -690  7082 0
-7079 -7080  7081 -690 -7083 0
-7079 -7080  7081 -690  7084 0

c  -1+1 --> 0
c    ( b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0 ∧  p_690) -> (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧ -b^{3, 231}_0)
c  in CNF:
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_2
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_1
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_0
c  in DIMACS:
-7079  7080 -7081 -690 -7082 0
-7079  7080 -7081 -690 -7083 0
-7079  7080 -7081 -690 -7084 0

c  0+1 --> 1
c    (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧  p_690) -> (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0)
c  in CNF:
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_2
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_1
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨  b^{3, 231}_0
c  in DIMACS:
 7079  7080  7081 -690 -7082 0
 7079  7080  7081 -690 -7083 0
 7079  7080  7081 -690  7084 0

c  1+1 --> 2
c    (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0 ∧  p_690) -> (-b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0)
c  in CNF:
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_2
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨  b^{3, 231}_1
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ -p_690 ∨ -b^{3, 231}_0
c  in DIMACS:
 7079  7080 -7081 -690 -7082 0
 7079  7080 -7081 -690  7083 0
 7079  7080 -7081 -690 -7084 0

c  2+1 --> break 
c    (-b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧  p_690) -> break
c  in CNF:
c     b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 7079 -7080  7081 -690 1162 0


c  2-1 --> 1
c    (-b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧ -p_690) -> (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0)
c  in CNF:
c     b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_2
c     b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_1
c     b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨  b^{3, 231}_0
c  in DIMACS:
 7079 -7080  7081  690 -7082 0
 7079 -7080  7081  690 -7083 0
 7079 -7080  7081  690  7084 0

c  1-1 --> 0
c    (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0 ∧ -p_690) -> (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧ -b^{3, 231}_0)
c  in CNF:
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_2
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_1
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_0
c  in DIMACS:
 7079  7080 -7081  690 -7082 0
 7079  7080 -7081  690 -7083 0
 7079  7080 -7081  690 -7084 0

c  0-1 --> -1
c    (-b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧ -p_690) -> ( b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0)
c  in CNF:
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨  b^{3, 231}_2
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_1
c     b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨  b^{3, 231}_0
c  in DIMACS:
 7079  7080  7081  690  7082 0
 7079  7080  7081  690 -7083 0
 7079  7080  7081  690  7084 0

c  -1-1 --> -2
c    ( b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧  b^{3, 230}_0 ∧ -p_690) -> ( b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0)
c  in CNF:
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨  b^{3, 231}_2
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨  b^{3, 231}_1
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨  p_690 ∨ -b^{3, 231}_0
c  in DIMACS:
-7079  7080 -7081  690  7082 0
-7079  7080 -7081  690  7083 0
-7079  7080 -7081  690 -7084 0

c  -2-1 --> break 
c    ( b^{3, 230}_2 ∧  b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨  b^{3, 230}_0 ∨  p_690 ∨ break
c  in DIMACS:
-7079 -7080  7081  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 230}_2 ∧ -b^{3, 230}_1 ∧ -b^{3, 230}_0 ∧ true) 
c  in CNF:
c    -b^{3, 230}_2 ∨  b^{3, 230}_1 ∨  b^{3, 230}_0 ∨ false 
c  in DIMACS:
-7079  7080  7081  0

c  3 does not represent an automaton state.
c    -(-b^{3, 230}_2 ∧  b^{3, 230}_1 ∧  b^{3, 230}_0 ∧ true) 
c  in CNF:
c     b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ false 
c  in DIMACS:
 7079 -7080 -7081  0
c  -3 does not represent an automaton state.
c    -( b^{3, 230}_2 ∧  b^{3, 230}_1 ∧  b^{3, 230}_0 ∧ true) 
c  in CNF:
c    -b^{3, 230}_2 ∨ -b^{3, 230}_1 ∨ -b^{3, 230}_0 ∨ false 
c  in DIMACS:
-7079 -7080 -7081  0

c i = 231
c  -2+1 --> -1
c    ( b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧  p_693) -> ( b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0)
c  in CNF:
c    -b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨  b^{3, 232}_2
c    -b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_1
c    -b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨  b^{3, 232}_0
c  in DIMACS:
-7082 -7083  7084 -693  7085 0
-7082 -7083  7084 -693 -7086 0
-7082 -7083  7084 -693  7087 0

c  -1+1 --> 0
c    ( b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0 ∧  p_693) -> (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧ -b^{3, 232}_0)
c  in CNF:
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_2
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_1
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_0
c  in DIMACS:
-7082  7083 -7084 -693 -7085 0
-7082  7083 -7084 -693 -7086 0
-7082  7083 -7084 -693 -7087 0

c  0+1 --> 1
c    (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧  p_693) -> (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0)
c  in CNF:
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_2
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_1
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨  b^{3, 232}_0
c  in DIMACS:
 7082  7083  7084 -693 -7085 0
 7082  7083  7084 -693 -7086 0
 7082  7083  7084 -693  7087 0

c  1+1 --> 2
c    (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0 ∧  p_693) -> (-b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0)
c  in CNF:
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_2
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨  b^{3, 232}_1
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ -p_693 ∨ -b^{3, 232}_0
c  in DIMACS:
 7082  7083 -7084 -693 -7085 0
 7082  7083 -7084 -693  7086 0
 7082  7083 -7084 -693 -7087 0

c  2+1 --> break 
c    (-b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧  p_693) -> break
c  in CNF:
c     b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 7082 -7083  7084 -693 1162 0


c  2-1 --> 1
c    (-b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧ -p_693) -> (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0)
c  in CNF:
c     b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_2
c     b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_1
c     b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨  b^{3, 232}_0
c  in DIMACS:
 7082 -7083  7084  693 -7085 0
 7082 -7083  7084  693 -7086 0
 7082 -7083  7084  693  7087 0

c  1-1 --> 0
c    (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0 ∧ -p_693) -> (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧ -b^{3, 232}_0)
c  in CNF:
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_2
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_1
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_0
c  in DIMACS:
 7082  7083 -7084  693 -7085 0
 7082  7083 -7084  693 -7086 0
 7082  7083 -7084  693 -7087 0

c  0-1 --> -1
c    (-b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧ -p_693) -> ( b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0)
c  in CNF:
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨  b^{3, 232}_2
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_1
c     b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨  b^{3, 232}_0
c  in DIMACS:
 7082  7083  7084  693  7085 0
 7082  7083  7084  693 -7086 0
 7082  7083  7084  693  7087 0

c  -1-1 --> -2
c    ( b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧  b^{3, 231}_0 ∧ -p_693) -> ( b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0)
c  in CNF:
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨  b^{3, 232}_2
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨  b^{3, 232}_1
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨  p_693 ∨ -b^{3, 232}_0
c  in DIMACS:
-7082  7083 -7084  693  7085 0
-7082  7083 -7084  693  7086 0
-7082  7083 -7084  693 -7087 0

c  -2-1 --> break 
c    ( b^{3, 231}_2 ∧  b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨  b^{3, 231}_0 ∨  p_693 ∨ break
c  in DIMACS:
-7082 -7083  7084  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 231}_2 ∧ -b^{3, 231}_1 ∧ -b^{3, 231}_0 ∧ true) 
c  in CNF:
c    -b^{3, 231}_2 ∨  b^{3, 231}_1 ∨  b^{3, 231}_0 ∨ false 
c  in DIMACS:
-7082  7083  7084  0

c  3 does not represent an automaton state.
c    -(-b^{3, 231}_2 ∧  b^{3, 231}_1 ∧  b^{3, 231}_0 ∧ true) 
c  in CNF:
c     b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ false 
c  in DIMACS:
 7082 -7083 -7084  0
c  -3 does not represent an automaton state.
c    -( b^{3, 231}_2 ∧  b^{3, 231}_1 ∧  b^{3, 231}_0 ∧ true) 
c  in CNF:
c    -b^{3, 231}_2 ∨ -b^{3, 231}_1 ∨ -b^{3, 231}_0 ∨ false 
c  in DIMACS:
-7082 -7083 -7084  0

c i = 232
c  -2+1 --> -1
c    ( b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧  p_696) -> ( b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0)
c  in CNF:
c    -b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨  b^{3, 233}_2
c    -b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_1
c    -b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨  b^{3, 233}_0
c  in DIMACS:
-7085 -7086  7087 -696  7088 0
-7085 -7086  7087 -696 -7089 0
-7085 -7086  7087 -696  7090 0

c  -1+1 --> 0
c    ( b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0 ∧  p_696) -> (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧ -b^{3, 233}_0)
c  in CNF:
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_2
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_1
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_0
c  in DIMACS:
-7085  7086 -7087 -696 -7088 0
-7085  7086 -7087 -696 -7089 0
-7085  7086 -7087 -696 -7090 0

c  0+1 --> 1
c    (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧  p_696) -> (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0)
c  in CNF:
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_2
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_1
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨  b^{3, 233}_0
c  in DIMACS:
 7085  7086  7087 -696 -7088 0
 7085  7086  7087 -696 -7089 0
 7085  7086  7087 -696  7090 0

c  1+1 --> 2
c    (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0 ∧  p_696) -> (-b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0)
c  in CNF:
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_2
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨  b^{3, 233}_1
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ -p_696 ∨ -b^{3, 233}_0
c  in DIMACS:
 7085  7086 -7087 -696 -7088 0
 7085  7086 -7087 -696  7089 0
 7085  7086 -7087 -696 -7090 0

c  2+1 --> break 
c    (-b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧  p_696) -> break
c  in CNF:
c     b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 7085 -7086  7087 -696 1162 0


c  2-1 --> 1
c    (-b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧ -p_696) -> (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0)
c  in CNF:
c     b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_2
c     b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_1
c     b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨  b^{3, 233}_0
c  in DIMACS:
 7085 -7086  7087  696 -7088 0
 7085 -7086  7087  696 -7089 0
 7085 -7086  7087  696  7090 0

c  1-1 --> 0
c    (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0 ∧ -p_696) -> (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧ -b^{3, 233}_0)
c  in CNF:
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_2
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_1
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_0
c  in DIMACS:
 7085  7086 -7087  696 -7088 0
 7085  7086 -7087  696 -7089 0
 7085  7086 -7087  696 -7090 0

c  0-1 --> -1
c    (-b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧ -p_696) -> ( b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0)
c  in CNF:
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨  b^{3, 233}_2
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_1
c     b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨  b^{3, 233}_0
c  in DIMACS:
 7085  7086  7087  696  7088 0
 7085  7086  7087  696 -7089 0
 7085  7086  7087  696  7090 0

c  -1-1 --> -2
c    ( b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧  b^{3, 232}_0 ∧ -p_696) -> ( b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0)
c  in CNF:
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨  b^{3, 233}_2
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨  b^{3, 233}_1
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨  p_696 ∨ -b^{3, 233}_0
c  in DIMACS:
-7085  7086 -7087  696  7088 0
-7085  7086 -7087  696  7089 0
-7085  7086 -7087  696 -7090 0

c  -2-1 --> break 
c    ( b^{3, 232}_2 ∧  b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨  b^{3, 232}_0 ∨  p_696 ∨ break
c  in DIMACS:
-7085 -7086  7087  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 232}_2 ∧ -b^{3, 232}_1 ∧ -b^{3, 232}_0 ∧ true) 
c  in CNF:
c    -b^{3, 232}_2 ∨  b^{3, 232}_1 ∨  b^{3, 232}_0 ∨ false 
c  in DIMACS:
-7085  7086  7087  0

c  3 does not represent an automaton state.
c    -(-b^{3, 232}_2 ∧  b^{3, 232}_1 ∧  b^{3, 232}_0 ∧ true) 
c  in CNF:
c     b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ false 
c  in DIMACS:
 7085 -7086 -7087  0
c  -3 does not represent an automaton state.
c    -( b^{3, 232}_2 ∧  b^{3, 232}_1 ∧  b^{3, 232}_0 ∧ true) 
c  in CNF:
c    -b^{3, 232}_2 ∨ -b^{3, 232}_1 ∨ -b^{3, 232}_0 ∨ false 
c  in DIMACS:
-7085 -7086 -7087  0

c i = 233
c  -2+1 --> -1
c    ( b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧  p_699) -> ( b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0)
c  in CNF:
c    -b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨  b^{3, 234}_2
c    -b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_1
c    -b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨  b^{3, 234}_0
c  in DIMACS:
-7088 -7089  7090 -699  7091 0
-7088 -7089  7090 -699 -7092 0
-7088 -7089  7090 -699  7093 0

c  -1+1 --> 0
c    ( b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0 ∧  p_699) -> (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧ -b^{3, 234}_0)
c  in CNF:
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_2
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_1
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_0
c  in DIMACS:
-7088  7089 -7090 -699 -7091 0
-7088  7089 -7090 -699 -7092 0
-7088  7089 -7090 -699 -7093 0

c  0+1 --> 1
c    (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧  p_699) -> (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0)
c  in CNF:
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_2
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_1
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨  b^{3, 234}_0
c  in DIMACS:
 7088  7089  7090 -699 -7091 0
 7088  7089  7090 -699 -7092 0
 7088  7089  7090 -699  7093 0

c  1+1 --> 2
c    (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0 ∧  p_699) -> (-b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0)
c  in CNF:
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_2
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨  b^{3, 234}_1
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ -p_699 ∨ -b^{3, 234}_0
c  in DIMACS:
 7088  7089 -7090 -699 -7091 0
 7088  7089 -7090 -699  7092 0
 7088  7089 -7090 -699 -7093 0

c  2+1 --> break 
c    (-b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧  p_699) -> break
c  in CNF:
c     b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ -p_699 ∨ break
c  in DIMACS:
 7088 -7089  7090 -699 1162 0


c  2-1 --> 1
c    (-b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧ -p_699) -> (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0)
c  in CNF:
c     b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_2
c     b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_1
c     b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨  b^{3, 234}_0
c  in DIMACS:
 7088 -7089  7090  699 -7091 0
 7088 -7089  7090  699 -7092 0
 7088 -7089  7090  699  7093 0

c  1-1 --> 0
c    (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0 ∧ -p_699) -> (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧ -b^{3, 234}_0)
c  in CNF:
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_2
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_1
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_0
c  in DIMACS:
 7088  7089 -7090  699 -7091 0
 7088  7089 -7090  699 -7092 0
 7088  7089 -7090  699 -7093 0

c  0-1 --> -1
c    (-b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧ -p_699) -> ( b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0)
c  in CNF:
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨  b^{3, 234}_2
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_1
c     b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨  b^{3, 234}_0
c  in DIMACS:
 7088  7089  7090  699  7091 0
 7088  7089  7090  699 -7092 0
 7088  7089  7090  699  7093 0

c  -1-1 --> -2
c    ( b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧  b^{3, 233}_0 ∧ -p_699) -> ( b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0)
c  in CNF:
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨  b^{3, 234}_2
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨  b^{3, 234}_1
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨  p_699 ∨ -b^{3, 234}_0
c  in DIMACS:
-7088  7089 -7090  699  7091 0
-7088  7089 -7090  699  7092 0
-7088  7089 -7090  699 -7093 0

c  -2-1 --> break 
c    ( b^{3, 233}_2 ∧  b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧ -p_699) -> break
c  in CNF:
c    -b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨  b^{3, 233}_0 ∨  p_699 ∨ break
c  in DIMACS:
-7088 -7089  7090  699 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 233}_2 ∧ -b^{3, 233}_1 ∧ -b^{3, 233}_0 ∧ true) 
c  in CNF:
c    -b^{3, 233}_2 ∨  b^{3, 233}_1 ∨  b^{3, 233}_0 ∨ false 
c  in DIMACS:
-7088  7089  7090  0

c  3 does not represent an automaton state.
c    -(-b^{3, 233}_2 ∧  b^{3, 233}_1 ∧  b^{3, 233}_0 ∧ true) 
c  in CNF:
c     b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ false 
c  in DIMACS:
 7088 -7089 -7090  0
c  -3 does not represent an automaton state.
c    -( b^{3, 233}_2 ∧  b^{3, 233}_1 ∧  b^{3, 233}_0 ∧ true) 
c  in CNF:
c    -b^{3, 233}_2 ∨ -b^{3, 233}_1 ∨ -b^{3, 233}_0 ∨ false 
c  in DIMACS:
-7088 -7089 -7090  0

c i = 234
c  -2+1 --> -1
c    ( b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧  p_702) -> ( b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0)
c  in CNF:
c    -b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨  b^{3, 235}_2
c    -b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_1
c    -b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨  b^{3, 235}_0
c  in DIMACS:
-7091 -7092  7093 -702  7094 0
-7091 -7092  7093 -702 -7095 0
-7091 -7092  7093 -702  7096 0

c  -1+1 --> 0
c    ( b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0 ∧  p_702) -> (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧ -b^{3, 235}_0)
c  in CNF:
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_2
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_1
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_0
c  in DIMACS:
-7091  7092 -7093 -702 -7094 0
-7091  7092 -7093 -702 -7095 0
-7091  7092 -7093 -702 -7096 0

c  0+1 --> 1
c    (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧  p_702) -> (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0)
c  in CNF:
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_2
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_1
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨  b^{3, 235}_0
c  in DIMACS:
 7091  7092  7093 -702 -7094 0
 7091  7092  7093 -702 -7095 0
 7091  7092  7093 -702  7096 0

c  1+1 --> 2
c    (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0 ∧  p_702) -> (-b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0)
c  in CNF:
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_2
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨  b^{3, 235}_1
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ -p_702 ∨ -b^{3, 235}_0
c  in DIMACS:
 7091  7092 -7093 -702 -7094 0
 7091  7092 -7093 -702  7095 0
 7091  7092 -7093 -702 -7096 0

c  2+1 --> break 
c    (-b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧  p_702) -> break
c  in CNF:
c     b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 7091 -7092  7093 -702 1162 0


c  2-1 --> 1
c    (-b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧ -p_702) -> (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0)
c  in CNF:
c     b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_2
c     b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_1
c     b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨  b^{3, 235}_0
c  in DIMACS:
 7091 -7092  7093  702 -7094 0
 7091 -7092  7093  702 -7095 0
 7091 -7092  7093  702  7096 0

c  1-1 --> 0
c    (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0 ∧ -p_702) -> (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧ -b^{3, 235}_0)
c  in CNF:
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_2
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_1
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_0
c  in DIMACS:
 7091  7092 -7093  702 -7094 0
 7091  7092 -7093  702 -7095 0
 7091  7092 -7093  702 -7096 0

c  0-1 --> -1
c    (-b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧ -p_702) -> ( b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0)
c  in CNF:
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨  b^{3, 235}_2
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_1
c     b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨  b^{3, 235}_0
c  in DIMACS:
 7091  7092  7093  702  7094 0
 7091  7092  7093  702 -7095 0
 7091  7092  7093  702  7096 0

c  -1-1 --> -2
c    ( b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧  b^{3, 234}_0 ∧ -p_702) -> ( b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0)
c  in CNF:
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨  b^{3, 235}_2
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨  b^{3, 235}_1
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨  p_702 ∨ -b^{3, 235}_0
c  in DIMACS:
-7091  7092 -7093  702  7094 0
-7091  7092 -7093  702  7095 0
-7091  7092 -7093  702 -7096 0

c  -2-1 --> break 
c    ( b^{3, 234}_2 ∧  b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨  b^{3, 234}_0 ∨  p_702 ∨ break
c  in DIMACS:
-7091 -7092  7093  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 234}_2 ∧ -b^{3, 234}_1 ∧ -b^{3, 234}_0 ∧ true) 
c  in CNF:
c    -b^{3, 234}_2 ∨  b^{3, 234}_1 ∨  b^{3, 234}_0 ∨ false 
c  in DIMACS:
-7091  7092  7093  0

c  3 does not represent an automaton state.
c    -(-b^{3, 234}_2 ∧  b^{3, 234}_1 ∧  b^{3, 234}_0 ∧ true) 
c  in CNF:
c     b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ false 
c  in DIMACS:
 7091 -7092 -7093  0
c  -3 does not represent an automaton state.
c    -( b^{3, 234}_2 ∧  b^{3, 234}_1 ∧  b^{3, 234}_0 ∧ true) 
c  in CNF:
c    -b^{3, 234}_2 ∨ -b^{3, 234}_1 ∨ -b^{3, 234}_0 ∨ false 
c  in DIMACS:
-7091 -7092 -7093  0

c i = 235
c  -2+1 --> -1
c    ( b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧  p_705) -> ( b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0)
c  in CNF:
c    -b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨  b^{3, 236}_2
c    -b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_1
c    -b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨  b^{3, 236}_0
c  in DIMACS:
-7094 -7095  7096 -705  7097 0
-7094 -7095  7096 -705 -7098 0
-7094 -7095  7096 -705  7099 0

c  -1+1 --> 0
c    ( b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0 ∧  p_705) -> (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧ -b^{3, 236}_0)
c  in CNF:
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_2
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_1
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_0
c  in DIMACS:
-7094  7095 -7096 -705 -7097 0
-7094  7095 -7096 -705 -7098 0
-7094  7095 -7096 -705 -7099 0

c  0+1 --> 1
c    (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧  p_705) -> (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0)
c  in CNF:
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_2
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_1
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨  b^{3, 236}_0
c  in DIMACS:
 7094  7095  7096 -705 -7097 0
 7094  7095  7096 -705 -7098 0
 7094  7095  7096 -705  7099 0

c  1+1 --> 2
c    (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0 ∧  p_705) -> (-b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0)
c  in CNF:
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_2
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨  b^{3, 236}_1
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ -p_705 ∨ -b^{3, 236}_0
c  in DIMACS:
 7094  7095 -7096 -705 -7097 0
 7094  7095 -7096 -705  7098 0
 7094  7095 -7096 -705 -7099 0

c  2+1 --> break 
c    (-b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧  p_705) -> break
c  in CNF:
c     b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 7094 -7095  7096 -705 1162 0


c  2-1 --> 1
c    (-b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧ -p_705) -> (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0)
c  in CNF:
c     b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_2
c     b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_1
c     b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨  b^{3, 236}_0
c  in DIMACS:
 7094 -7095  7096  705 -7097 0
 7094 -7095  7096  705 -7098 0
 7094 -7095  7096  705  7099 0

c  1-1 --> 0
c    (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0 ∧ -p_705) -> (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧ -b^{3, 236}_0)
c  in CNF:
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_2
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_1
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_0
c  in DIMACS:
 7094  7095 -7096  705 -7097 0
 7094  7095 -7096  705 -7098 0
 7094  7095 -7096  705 -7099 0

c  0-1 --> -1
c    (-b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧ -p_705) -> ( b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0)
c  in CNF:
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨  b^{3, 236}_2
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_1
c     b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨  b^{3, 236}_0
c  in DIMACS:
 7094  7095  7096  705  7097 0
 7094  7095  7096  705 -7098 0
 7094  7095  7096  705  7099 0

c  -1-1 --> -2
c    ( b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧  b^{3, 235}_0 ∧ -p_705) -> ( b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0)
c  in CNF:
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨  b^{3, 236}_2
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨  b^{3, 236}_1
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨  p_705 ∨ -b^{3, 236}_0
c  in DIMACS:
-7094  7095 -7096  705  7097 0
-7094  7095 -7096  705  7098 0
-7094  7095 -7096  705 -7099 0

c  -2-1 --> break 
c    ( b^{3, 235}_2 ∧  b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨  b^{3, 235}_0 ∨  p_705 ∨ break
c  in DIMACS:
-7094 -7095  7096  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 235}_2 ∧ -b^{3, 235}_1 ∧ -b^{3, 235}_0 ∧ true) 
c  in CNF:
c    -b^{3, 235}_2 ∨  b^{3, 235}_1 ∨  b^{3, 235}_0 ∨ false 
c  in DIMACS:
-7094  7095  7096  0

c  3 does not represent an automaton state.
c    -(-b^{3, 235}_2 ∧  b^{3, 235}_1 ∧  b^{3, 235}_0 ∧ true) 
c  in CNF:
c     b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ false 
c  in DIMACS:
 7094 -7095 -7096  0
c  -3 does not represent an automaton state.
c    -( b^{3, 235}_2 ∧  b^{3, 235}_1 ∧  b^{3, 235}_0 ∧ true) 
c  in CNF:
c    -b^{3, 235}_2 ∨ -b^{3, 235}_1 ∨ -b^{3, 235}_0 ∨ false 
c  in DIMACS:
-7094 -7095 -7096  0

c i = 236
c  -2+1 --> -1
c    ( b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧  p_708) -> ( b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0)
c  in CNF:
c    -b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨  b^{3, 237}_2
c    -b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_1
c    -b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨  b^{3, 237}_0
c  in DIMACS:
-7097 -7098  7099 -708  7100 0
-7097 -7098  7099 -708 -7101 0
-7097 -7098  7099 -708  7102 0

c  -1+1 --> 0
c    ( b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0 ∧  p_708) -> (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧ -b^{3, 237}_0)
c  in CNF:
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_2
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_1
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_0
c  in DIMACS:
-7097  7098 -7099 -708 -7100 0
-7097  7098 -7099 -708 -7101 0
-7097  7098 -7099 -708 -7102 0

c  0+1 --> 1
c    (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧  p_708) -> (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0)
c  in CNF:
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_2
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_1
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨  b^{3, 237}_0
c  in DIMACS:
 7097  7098  7099 -708 -7100 0
 7097  7098  7099 -708 -7101 0
 7097  7098  7099 -708  7102 0

c  1+1 --> 2
c    (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0 ∧  p_708) -> (-b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0)
c  in CNF:
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_2
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨  b^{3, 237}_1
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ -p_708 ∨ -b^{3, 237}_0
c  in DIMACS:
 7097  7098 -7099 -708 -7100 0
 7097  7098 -7099 -708  7101 0
 7097  7098 -7099 -708 -7102 0

c  2+1 --> break 
c    (-b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧  p_708) -> break
c  in CNF:
c     b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 7097 -7098  7099 -708 1162 0


c  2-1 --> 1
c    (-b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧ -p_708) -> (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0)
c  in CNF:
c     b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_2
c     b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_1
c     b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨  b^{3, 237}_0
c  in DIMACS:
 7097 -7098  7099  708 -7100 0
 7097 -7098  7099  708 -7101 0
 7097 -7098  7099  708  7102 0

c  1-1 --> 0
c    (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0 ∧ -p_708) -> (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧ -b^{3, 237}_0)
c  in CNF:
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_2
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_1
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_0
c  in DIMACS:
 7097  7098 -7099  708 -7100 0
 7097  7098 -7099  708 -7101 0
 7097  7098 -7099  708 -7102 0

c  0-1 --> -1
c    (-b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧ -p_708) -> ( b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0)
c  in CNF:
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨  b^{3, 237}_2
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_1
c     b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨  b^{3, 237}_0
c  in DIMACS:
 7097  7098  7099  708  7100 0
 7097  7098  7099  708 -7101 0
 7097  7098  7099  708  7102 0

c  -1-1 --> -2
c    ( b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧  b^{3, 236}_0 ∧ -p_708) -> ( b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0)
c  in CNF:
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨  b^{3, 237}_2
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨  b^{3, 237}_1
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨  p_708 ∨ -b^{3, 237}_0
c  in DIMACS:
-7097  7098 -7099  708  7100 0
-7097  7098 -7099  708  7101 0
-7097  7098 -7099  708 -7102 0

c  -2-1 --> break 
c    ( b^{3, 236}_2 ∧  b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨  b^{3, 236}_0 ∨  p_708 ∨ break
c  in DIMACS:
-7097 -7098  7099  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 236}_2 ∧ -b^{3, 236}_1 ∧ -b^{3, 236}_0 ∧ true) 
c  in CNF:
c    -b^{3, 236}_2 ∨  b^{3, 236}_1 ∨  b^{3, 236}_0 ∨ false 
c  in DIMACS:
-7097  7098  7099  0

c  3 does not represent an automaton state.
c    -(-b^{3, 236}_2 ∧  b^{3, 236}_1 ∧  b^{3, 236}_0 ∧ true) 
c  in CNF:
c     b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ false 
c  in DIMACS:
 7097 -7098 -7099  0
c  -3 does not represent an automaton state.
c    -( b^{3, 236}_2 ∧  b^{3, 236}_1 ∧  b^{3, 236}_0 ∧ true) 
c  in CNF:
c    -b^{3, 236}_2 ∨ -b^{3, 236}_1 ∨ -b^{3, 236}_0 ∨ false 
c  in DIMACS:
-7097 -7098 -7099  0

c i = 237
c  -2+1 --> -1
c    ( b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧  p_711) -> ( b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0)
c  in CNF:
c    -b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨  b^{3, 238}_2
c    -b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_1
c    -b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨  b^{3, 238}_0
c  in DIMACS:
-7100 -7101  7102 -711  7103 0
-7100 -7101  7102 -711 -7104 0
-7100 -7101  7102 -711  7105 0

c  -1+1 --> 0
c    ( b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0 ∧  p_711) -> (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧ -b^{3, 238}_0)
c  in CNF:
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_2
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_1
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_0
c  in DIMACS:
-7100  7101 -7102 -711 -7103 0
-7100  7101 -7102 -711 -7104 0
-7100  7101 -7102 -711 -7105 0

c  0+1 --> 1
c    (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧  p_711) -> (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0)
c  in CNF:
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_2
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_1
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨  b^{3, 238}_0
c  in DIMACS:
 7100  7101  7102 -711 -7103 0
 7100  7101  7102 -711 -7104 0
 7100  7101  7102 -711  7105 0

c  1+1 --> 2
c    (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0 ∧  p_711) -> (-b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0)
c  in CNF:
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_2
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨  b^{3, 238}_1
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ -p_711 ∨ -b^{3, 238}_0
c  in DIMACS:
 7100  7101 -7102 -711 -7103 0
 7100  7101 -7102 -711  7104 0
 7100  7101 -7102 -711 -7105 0

c  2+1 --> break 
c    (-b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧  p_711) -> break
c  in CNF:
c     b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ -p_711 ∨ break
c  in DIMACS:
 7100 -7101  7102 -711 1162 0


c  2-1 --> 1
c    (-b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧ -p_711) -> (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0)
c  in CNF:
c     b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_2
c     b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_1
c     b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨  b^{3, 238}_0
c  in DIMACS:
 7100 -7101  7102  711 -7103 0
 7100 -7101  7102  711 -7104 0
 7100 -7101  7102  711  7105 0

c  1-1 --> 0
c    (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0 ∧ -p_711) -> (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧ -b^{3, 238}_0)
c  in CNF:
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_2
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_1
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_0
c  in DIMACS:
 7100  7101 -7102  711 -7103 0
 7100  7101 -7102  711 -7104 0
 7100  7101 -7102  711 -7105 0

c  0-1 --> -1
c    (-b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧ -p_711) -> ( b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0)
c  in CNF:
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨  b^{3, 238}_2
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_1
c     b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨  b^{3, 238}_0
c  in DIMACS:
 7100  7101  7102  711  7103 0
 7100  7101  7102  711 -7104 0
 7100  7101  7102  711  7105 0

c  -1-1 --> -2
c    ( b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧  b^{3, 237}_0 ∧ -p_711) -> ( b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0)
c  in CNF:
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨  b^{3, 238}_2
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨  b^{3, 238}_1
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨  p_711 ∨ -b^{3, 238}_0
c  in DIMACS:
-7100  7101 -7102  711  7103 0
-7100  7101 -7102  711  7104 0
-7100  7101 -7102  711 -7105 0

c  -2-1 --> break 
c    ( b^{3, 237}_2 ∧  b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧ -p_711) -> break
c  in CNF:
c    -b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨  b^{3, 237}_0 ∨  p_711 ∨ break
c  in DIMACS:
-7100 -7101  7102  711 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 237}_2 ∧ -b^{3, 237}_1 ∧ -b^{3, 237}_0 ∧ true) 
c  in CNF:
c    -b^{3, 237}_2 ∨  b^{3, 237}_1 ∨  b^{3, 237}_0 ∨ false 
c  in DIMACS:
-7100  7101  7102  0

c  3 does not represent an automaton state.
c    -(-b^{3, 237}_2 ∧  b^{3, 237}_1 ∧  b^{3, 237}_0 ∧ true) 
c  in CNF:
c     b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ false 
c  in DIMACS:
 7100 -7101 -7102  0
c  -3 does not represent an automaton state.
c    -( b^{3, 237}_2 ∧  b^{3, 237}_1 ∧  b^{3, 237}_0 ∧ true) 
c  in CNF:
c    -b^{3, 237}_2 ∨ -b^{3, 237}_1 ∨ -b^{3, 237}_0 ∨ false 
c  in DIMACS:
-7100 -7101 -7102  0

c i = 238
c  -2+1 --> -1
c    ( b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧  p_714) -> ( b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0)
c  in CNF:
c    -b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨  b^{3, 239}_2
c    -b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_1
c    -b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨  b^{3, 239}_0
c  in DIMACS:
-7103 -7104  7105 -714  7106 0
-7103 -7104  7105 -714 -7107 0
-7103 -7104  7105 -714  7108 0

c  -1+1 --> 0
c    ( b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0 ∧  p_714) -> (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧ -b^{3, 239}_0)
c  in CNF:
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_2
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_1
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_0
c  in DIMACS:
-7103  7104 -7105 -714 -7106 0
-7103  7104 -7105 -714 -7107 0
-7103  7104 -7105 -714 -7108 0

c  0+1 --> 1
c    (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧  p_714) -> (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0)
c  in CNF:
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_2
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_1
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨  b^{3, 239}_0
c  in DIMACS:
 7103  7104  7105 -714 -7106 0
 7103  7104  7105 -714 -7107 0
 7103  7104  7105 -714  7108 0

c  1+1 --> 2
c    (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0 ∧  p_714) -> (-b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0)
c  in CNF:
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_2
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨  b^{3, 239}_1
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ -p_714 ∨ -b^{3, 239}_0
c  in DIMACS:
 7103  7104 -7105 -714 -7106 0
 7103  7104 -7105 -714  7107 0
 7103  7104 -7105 -714 -7108 0

c  2+1 --> break 
c    (-b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧  p_714) -> break
c  in CNF:
c     b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 7103 -7104  7105 -714 1162 0


c  2-1 --> 1
c    (-b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧ -p_714) -> (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0)
c  in CNF:
c     b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_2
c     b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_1
c     b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨  b^{3, 239}_0
c  in DIMACS:
 7103 -7104  7105  714 -7106 0
 7103 -7104  7105  714 -7107 0
 7103 -7104  7105  714  7108 0

c  1-1 --> 0
c    (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0 ∧ -p_714) -> (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧ -b^{3, 239}_0)
c  in CNF:
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_2
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_1
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_0
c  in DIMACS:
 7103  7104 -7105  714 -7106 0
 7103  7104 -7105  714 -7107 0
 7103  7104 -7105  714 -7108 0

c  0-1 --> -1
c    (-b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧ -p_714) -> ( b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0)
c  in CNF:
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨  b^{3, 239}_2
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_1
c     b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨  b^{3, 239}_0
c  in DIMACS:
 7103  7104  7105  714  7106 0
 7103  7104  7105  714 -7107 0
 7103  7104  7105  714  7108 0

c  -1-1 --> -2
c    ( b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧  b^{3, 238}_0 ∧ -p_714) -> ( b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0)
c  in CNF:
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨  b^{3, 239}_2
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨  b^{3, 239}_1
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨  p_714 ∨ -b^{3, 239}_0
c  in DIMACS:
-7103  7104 -7105  714  7106 0
-7103  7104 -7105  714  7107 0
-7103  7104 -7105  714 -7108 0

c  -2-1 --> break 
c    ( b^{3, 238}_2 ∧  b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨  b^{3, 238}_0 ∨  p_714 ∨ break
c  in DIMACS:
-7103 -7104  7105  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 238}_2 ∧ -b^{3, 238}_1 ∧ -b^{3, 238}_0 ∧ true) 
c  in CNF:
c    -b^{3, 238}_2 ∨  b^{3, 238}_1 ∨  b^{3, 238}_0 ∨ false 
c  in DIMACS:
-7103  7104  7105  0

c  3 does not represent an automaton state.
c    -(-b^{3, 238}_2 ∧  b^{3, 238}_1 ∧  b^{3, 238}_0 ∧ true) 
c  in CNF:
c     b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ false 
c  in DIMACS:
 7103 -7104 -7105  0
c  -3 does not represent an automaton state.
c    -( b^{3, 238}_2 ∧  b^{3, 238}_1 ∧  b^{3, 238}_0 ∧ true) 
c  in CNF:
c    -b^{3, 238}_2 ∨ -b^{3, 238}_1 ∨ -b^{3, 238}_0 ∨ false 
c  in DIMACS:
-7103 -7104 -7105  0

c i = 239
c  -2+1 --> -1
c    ( b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧  p_717) -> ( b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0)
c  in CNF:
c    -b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨  b^{3, 240}_2
c    -b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_1
c    -b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨  b^{3, 240}_0
c  in DIMACS:
-7106 -7107  7108 -717  7109 0
-7106 -7107  7108 -717 -7110 0
-7106 -7107  7108 -717  7111 0

c  -1+1 --> 0
c    ( b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0 ∧  p_717) -> (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧ -b^{3, 240}_0)
c  in CNF:
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_2
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_1
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_0
c  in DIMACS:
-7106  7107 -7108 -717 -7109 0
-7106  7107 -7108 -717 -7110 0
-7106  7107 -7108 -717 -7111 0

c  0+1 --> 1
c    (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧  p_717) -> (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0)
c  in CNF:
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_2
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_1
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨  b^{3, 240}_0
c  in DIMACS:
 7106  7107  7108 -717 -7109 0
 7106  7107  7108 -717 -7110 0
 7106  7107  7108 -717  7111 0

c  1+1 --> 2
c    (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0 ∧  p_717) -> (-b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0)
c  in CNF:
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_2
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨  b^{3, 240}_1
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ -p_717 ∨ -b^{3, 240}_0
c  in DIMACS:
 7106  7107 -7108 -717 -7109 0
 7106  7107 -7108 -717  7110 0
 7106  7107 -7108 -717 -7111 0

c  2+1 --> break 
c    (-b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧  p_717) -> break
c  in CNF:
c     b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ -p_717 ∨ break
c  in DIMACS:
 7106 -7107  7108 -717 1162 0


c  2-1 --> 1
c    (-b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧ -p_717) -> (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0)
c  in CNF:
c     b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_2
c     b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_1
c     b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨  b^{3, 240}_0
c  in DIMACS:
 7106 -7107  7108  717 -7109 0
 7106 -7107  7108  717 -7110 0
 7106 -7107  7108  717  7111 0

c  1-1 --> 0
c    (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0 ∧ -p_717) -> (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧ -b^{3, 240}_0)
c  in CNF:
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_2
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_1
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_0
c  in DIMACS:
 7106  7107 -7108  717 -7109 0
 7106  7107 -7108  717 -7110 0
 7106  7107 -7108  717 -7111 0

c  0-1 --> -1
c    (-b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧ -p_717) -> ( b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0)
c  in CNF:
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨  b^{3, 240}_2
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_1
c     b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨  b^{3, 240}_0
c  in DIMACS:
 7106  7107  7108  717  7109 0
 7106  7107  7108  717 -7110 0
 7106  7107  7108  717  7111 0

c  -1-1 --> -2
c    ( b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧  b^{3, 239}_0 ∧ -p_717) -> ( b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0)
c  in CNF:
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨  b^{3, 240}_2
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨  b^{3, 240}_1
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨  p_717 ∨ -b^{3, 240}_0
c  in DIMACS:
-7106  7107 -7108  717  7109 0
-7106  7107 -7108  717  7110 0
-7106  7107 -7108  717 -7111 0

c  -2-1 --> break 
c    ( b^{3, 239}_2 ∧  b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧ -p_717) -> break
c  in CNF:
c    -b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨  b^{3, 239}_0 ∨  p_717 ∨ break
c  in DIMACS:
-7106 -7107  7108  717 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 239}_2 ∧ -b^{3, 239}_1 ∧ -b^{3, 239}_0 ∧ true) 
c  in CNF:
c    -b^{3, 239}_2 ∨  b^{3, 239}_1 ∨  b^{3, 239}_0 ∨ false 
c  in DIMACS:
-7106  7107  7108  0

c  3 does not represent an automaton state.
c    -(-b^{3, 239}_2 ∧  b^{3, 239}_1 ∧  b^{3, 239}_0 ∧ true) 
c  in CNF:
c     b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ false 
c  in DIMACS:
 7106 -7107 -7108  0
c  -3 does not represent an automaton state.
c    -( b^{3, 239}_2 ∧  b^{3, 239}_1 ∧  b^{3, 239}_0 ∧ true) 
c  in CNF:
c    -b^{3, 239}_2 ∨ -b^{3, 239}_1 ∨ -b^{3, 239}_0 ∨ false 
c  in DIMACS:
-7106 -7107 -7108  0

c i = 240
c  -2+1 --> -1
c    ( b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧  p_720) -> ( b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0)
c  in CNF:
c    -b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨  b^{3, 241}_2
c    -b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_1
c    -b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨  b^{3, 241}_0
c  in DIMACS:
-7109 -7110  7111 -720  7112 0
-7109 -7110  7111 -720 -7113 0
-7109 -7110  7111 -720  7114 0

c  -1+1 --> 0
c    ( b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0 ∧  p_720) -> (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧ -b^{3, 241}_0)
c  in CNF:
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_2
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_1
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_0
c  in DIMACS:
-7109  7110 -7111 -720 -7112 0
-7109  7110 -7111 -720 -7113 0
-7109  7110 -7111 -720 -7114 0

c  0+1 --> 1
c    (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧  p_720) -> (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0)
c  in CNF:
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_2
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_1
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨  b^{3, 241}_0
c  in DIMACS:
 7109  7110  7111 -720 -7112 0
 7109  7110  7111 -720 -7113 0
 7109  7110  7111 -720  7114 0

c  1+1 --> 2
c    (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0 ∧  p_720) -> (-b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0)
c  in CNF:
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_2
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨  b^{3, 241}_1
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ -p_720 ∨ -b^{3, 241}_0
c  in DIMACS:
 7109  7110 -7111 -720 -7112 0
 7109  7110 -7111 -720  7113 0
 7109  7110 -7111 -720 -7114 0

c  2+1 --> break 
c    (-b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧  p_720) -> break
c  in CNF:
c     b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 7109 -7110  7111 -720 1162 0


c  2-1 --> 1
c    (-b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧ -p_720) -> (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0)
c  in CNF:
c     b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_2
c     b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_1
c     b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨  b^{3, 241}_0
c  in DIMACS:
 7109 -7110  7111  720 -7112 0
 7109 -7110  7111  720 -7113 0
 7109 -7110  7111  720  7114 0

c  1-1 --> 0
c    (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0 ∧ -p_720) -> (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧ -b^{3, 241}_0)
c  in CNF:
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_2
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_1
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_0
c  in DIMACS:
 7109  7110 -7111  720 -7112 0
 7109  7110 -7111  720 -7113 0
 7109  7110 -7111  720 -7114 0

c  0-1 --> -1
c    (-b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧ -p_720) -> ( b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0)
c  in CNF:
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨  b^{3, 241}_2
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_1
c     b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨  b^{3, 241}_0
c  in DIMACS:
 7109  7110  7111  720  7112 0
 7109  7110  7111  720 -7113 0
 7109  7110  7111  720  7114 0

c  -1-1 --> -2
c    ( b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧  b^{3, 240}_0 ∧ -p_720) -> ( b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0)
c  in CNF:
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨  b^{3, 241}_2
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨  b^{3, 241}_1
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨  p_720 ∨ -b^{3, 241}_0
c  in DIMACS:
-7109  7110 -7111  720  7112 0
-7109  7110 -7111  720  7113 0
-7109  7110 -7111  720 -7114 0

c  -2-1 --> break 
c    ( b^{3, 240}_2 ∧  b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨  b^{3, 240}_0 ∨  p_720 ∨ break
c  in DIMACS:
-7109 -7110  7111  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 240}_2 ∧ -b^{3, 240}_1 ∧ -b^{3, 240}_0 ∧ true) 
c  in CNF:
c    -b^{3, 240}_2 ∨  b^{3, 240}_1 ∨  b^{3, 240}_0 ∨ false 
c  in DIMACS:
-7109  7110  7111  0

c  3 does not represent an automaton state.
c    -(-b^{3, 240}_2 ∧  b^{3, 240}_1 ∧  b^{3, 240}_0 ∧ true) 
c  in CNF:
c     b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ false 
c  in DIMACS:
 7109 -7110 -7111  0
c  -3 does not represent an automaton state.
c    -( b^{3, 240}_2 ∧  b^{3, 240}_1 ∧  b^{3, 240}_0 ∧ true) 
c  in CNF:
c    -b^{3, 240}_2 ∨ -b^{3, 240}_1 ∨ -b^{3, 240}_0 ∨ false 
c  in DIMACS:
-7109 -7110 -7111  0

c i = 241
c  -2+1 --> -1
c    ( b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧  p_723) -> ( b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0)
c  in CNF:
c    -b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨  b^{3, 242}_2
c    -b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_1
c    -b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨  b^{3, 242}_0
c  in DIMACS:
-7112 -7113  7114 -723  7115 0
-7112 -7113  7114 -723 -7116 0
-7112 -7113  7114 -723  7117 0

c  -1+1 --> 0
c    ( b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0 ∧  p_723) -> (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧ -b^{3, 242}_0)
c  in CNF:
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_2
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_1
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_0
c  in DIMACS:
-7112  7113 -7114 -723 -7115 0
-7112  7113 -7114 -723 -7116 0
-7112  7113 -7114 -723 -7117 0

c  0+1 --> 1
c    (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧  p_723) -> (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0)
c  in CNF:
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_2
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_1
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨  b^{3, 242}_0
c  in DIMACS:
 7112  7113  7114 -723 -7115 0
 7112  7113  7114 -723 -7116 0
 7112  7113  7114 -723  7117 0

c  1+1 --> 2
c    (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0 ∧  p_723) -> (-b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0)
c  in CNF:
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_2
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨  b^{3, 242}_1
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ -p_723 ∨ -b^{3, 242}_0
c  in DIMACS:
 7112  7113 -7114 -723 -7115 0
 7112  7113 -7114 -723  7116 0
 7112  7113 -7114 -723 -7117 0

c  2+1 --> break 
c    (-b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧  p_723) -> break
c  in CNF:
c     b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ -p_723 ∨ break
c  in DIMACS:
 7112 -7113  7114 -723 1162 0


c  2-1 --> 1
c    (-b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧ -p_723) -> (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0)
c  in CNF:
c     b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_2
c     b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_1
c     b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨  b^{3, 242}_0
c  in DIMACS:
 7112 -7113  7114  723 -7115 0
 7112 -7113  7114  723 -7116 0
 7112 -7113  7114  723  7117 0

c  1-1 --> 0
c    (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0 ∧ -p_723) -> (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧ -b^{3, 242}_0)
c  in CNF:
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_2
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_1
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_0
c  in DIMACS:
 7112  7113 -7114  723 -7115 0
 7112  7113 -7114  723 -7116 0
 7112  7113 -7114  723 -7117 0

c  0-1 --> -1
c    (-b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧ -p_723) -> ( b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0)
c  in CNF:
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨  b^{3, 242}_2
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_1
c     b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨  b^{3, 242}_0
c  in DIMACS:
 7112  7113  7114  723  7115 0
 7112  7113  7114  723 -7116 0
 7112  7113  7114  723  7117 0

c  -1-1 --> -2
c    ( b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧  b^{3, 241}_0 ∧ -p_723) -> ( b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0)
c  in CNF:
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨  b^{3, 242}_2
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨  b^{3, 242}_1
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨  p_723 ∨ -b^{3, 242}_0
c  in DIMACS:
-7112  7113 -7114  723  7115 0
-7112  7113 -7114  723  7116 0
-7112  7113 -7114  723 -7117 0

c  -2-1 --> break 
c    ( b^{3, 241}_2 ∧  b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧ -p_723) -> break
c  in CNF:
c    -b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨  b^{3, 241}_0 ∨  p_723 ∨ break
c  in DIMACS:
-7112 -7113  7114  723 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 241}_2 ∧ -b^{3, 241}_1 ∧ -b^{3, 241}_0 ∧ true) 
c  in CNF:
c    -b^{3, 241}_2 ∨  b^{3, 241}_1 ∨  b^{3, 241}_0 ∨ false 
c  in DIMACS:
-7112  7113  7114  0

c  3 does not represent an automaton state.
c    -(-b^{3, 241}_2 ∧  b^{3, 241}_1 ∧  b^{3, 241}_0 ∧ true) 
c  in CNF:
c     b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ false 
c  in DIMACS:
 7112 -7113 -7114  0
c  -3 does not represent an automaton state.
c    -( b^{3, 241}_2 ∧  b^{3, 241}_1 ∧  b^{3, 241}_0 ∧ true) 
c  in CNF:
c    -b^{3, 241}_2 ∨ -b^{3, 241}_1 ∨ -b^{3, 241}_0 ∨ false 
c  in DIMACS:
-7112 -7113 -7114  0

c i = 242
c  -2+1 --> -1
c    ( b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧  p_726) -> ( b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0)
c  in CNF:
c    -b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨  b^{3, 243}_2
c    -b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_1
c    -b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨  b^{3, 243}_0
c  in DIMACS:
-7115 -7116  7117 -726  7118 0
-7115 -7116  7117 -726 -7119 0
-7115 -7116  7117 -726  7120 0

c  -1+1 --> 0
c    ( b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0 ∧  p_726) -> (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧ -b^{3, 243}_0)
c  in CNF:
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_2
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_1
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_0
c  in DIMACS:
-7115  7116 -7117 -726 -7118 0
-7115  7116 -7117 -726 -7119 0
-7115  7116 -7117 -726 -7120 0

c  0+1 --> 1
c    (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧  p_726) -> (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0)
c  in CNF:
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_2
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_1
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨  b^{3, 243}_0
c  in DIMACS:
 7115  7116  7117 -726 -7118 0
 7115  7116  7117 -726 -7119 0
 7115  7116  7117 -726  7120 0

c  1+1 --> 2
c    (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0 ∧  p_726) -> (-b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0)
c  in CNF:
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_2
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨  b^{3, 243}_1
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ -p_726 ∨ -b^{3, 243}_0
c  in DIMACS:
 7115  7116 -7117 -726 -7118 0
 7115  7116 -7117 -726  7119 0
 7115  7116 -7117 -726 -7120 0

c  2+1 --> break 
c    (-b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧  p_726) -> break
c  in CNF:
c     b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 7115 -7116  7117 -726 1162 0


c  2-1 --> 1
c    (-b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧ -p_726) -> (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0)
c  in CNF:
c     b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_2
c     b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_1
c     b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨  b^{3, 243}_0
c  in DIMACS:
 7115 -7116  7117  726 -7118 0
 7115 -7116  7117  726 -7119 0
 7115 -7116  7117  726  7120 0

c  1-1 --> 0
c    (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0 ∧ -p_726) -> (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧ -b^{3, 243}_0)
c  in CNF:
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_2
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_1
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_0
c  in DIMACS:
 7115  7116 -7117  726 -7118 0
 7115  7116 -7117  726 -7119 0
 7115  7116 -7117  726 -7120 0

c  0-1 --> -1
c    (-b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧ -p_726) -> ( b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0)
c  in CNF:
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨  b^{3, 243}_2
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_1
c     b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨  b^{3, 243}_0
c  in DIMACS:
 7115  7116  7117  726  7118 0
 7115  7116  7117  726 -7119 0
 7115  7116  7117  726  7120 0

c  -1-1 --> -2
c    ( b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧  b^{3, 242}_0 ∧ -p_726) -> ( b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0)
c  in CNF:
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨  b^{3, 243}_2
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨  b^{3, 243}_1
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨  p_726 ∨ -b^{3, 243}_0
c  in DIMACS:
-7115  7116 -7117  726  7118 0
-7115  7116 -7117  726  7119 0
-7115  7116 -7117  726 -7120 0

c  -2-1 --> break 
c    ( b^{3, 242}_2 ∧  b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨  b^{3, 242}_0 ∨  p_726 ∨ break
c  in DIMACS:
-7115 -7116  7117  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 242}_2 ∧ -b^{3, 242}_1 ∧ -b^{3, 242}_0 ∧ true) 
c  in CNF:
c    -b^{3, 242}_2 ∨  b^{3, 242}_1 ∨  b^{3, 242}_0 ∨ false 
c  in DIMACS:
-7115  7116  7117  0

c  3 does not represent an automaton state.
c    -(-b^{3, 242}_2 ∧  b^{3, 242}_1 ∧  b^{3, 242}_0 ∧ true) 
c  in CNF:
c     b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ false 
c  in DIMACS:
 7115 -7116 -7117  0
c  -3 does not represent an automaton state.
c    -( b^{3, 242}_2 ∧  b^{3, 242}_1 ∧  b^{3, 242}_0 ∧ true) 
c  in CNF:
c    -b^{3, 242}_2 ∨ -b^{3, 242}_1 ∨ -b^{3, 242}_0 ∨ false 
c  in DIMACS:
-7115 -7116 -7117  0

c i = 243
c  -2+1 --> -1
c    ( b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧  p_729) -> ( b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0)
c  in CNF:
c    -b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨  b^{3, 244}_2
c    -b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_1
c    -b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨  b^{3, 244}_0
c  in DIMACS:
-7118 -7119  7120 -729  7121 0
-7118 -7119  7120 -729 -7122 0
-7118 -7119  7120 -729  7123 0

c  -1+1 --> 0
c    ( b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0 ∧  p_729) -> (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧ -b^{3, 244}_0)
c  in CNF:
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_2
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_1
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_0
c  in DIMACS:
-7118  7119 -7120 -729 -7121 0
-7118  7119 -7120 -729 -7122 0
-7118  7119 -7120 -729 -7123 0

c  0+1 --> 1
c    (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧  p_729) -> (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0)
c  in CNF:
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_2
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_1
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨  b^{3, 244}_0
c  in DIMACS:
 7118  7119  7120 -729 -7121 0
 7118  7119  7120 -729 -7122 0
 7118  7119  7120 -729  7123 0

c  1+1 --> 2
c    (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0 ∧  p_729) -> (-b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0)
c  in CNF:
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_2
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨  b^{3, 244}_1
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ -p_729 ∨ -b^{3, 244}_0
c  in DIMACS:
 7118  7119 -7120 -729 -7121 0
 7118  7119 -7120 -729  7122 0
 7118  7119 -7120 -729 -7123 0

c  2+1 --> break 
c    (-b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧  p_729) -> break
c  in CNF:
c     b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 7118 -7119  7120 -729 1162 0


c  2-1 --> 1
c    (-b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧ -p_729) -> (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0)
c  in CNF:
c     b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_2
c     b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_1
c     b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨  b^{3, 244}_0
c  in DIMACS:
 7118 -7119  7120  729 -7121 0
 7118 -7119  7120  729 -7122 0
 7118 -7119  7120  729  7123 0

c  1-1 --> 0
c    (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0 ∧ -p_729) -> (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧ -b^{3, 244}_0)
c  in CNF:
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_2
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_1
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_0
c  in DIMACS:
 7118  7119 -7120  729 -7121 0
 7118  7119 -7120  729 -7122 0
 7118  7119 -7120  729 -7123 0

c  0-1 --> -1
c    (-b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧ -p_729) -> ( b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0)
c  in CNF:
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨  b^{3, 244}_2
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_1
c     b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨  b^{3, 244}_0
c  in DIMACS:
 7118  7119  7120  729  7121 0
 7118  7119  7120  729 -7122 0
 7118  7119  7120  729  7123 0

c  -1-1 --> -2
c    ( b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧  b^{3, 243}_0 ∧ -p_729) -> ( b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0)
c  in CNF:
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨  b^{3, 244}_2
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨  b^{3, 244}_1
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨  p_729 ∨ -b^{3, 244}_0
c  in DIMACS:
-7118  7119 -7120  729  7121 0
-7118  7119 -7120  729  7122 0
-7118  7119 -7120  729 -7123 0

c  -2-1 --> break 
c    ( b^{3, 243}_2 ∧  b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨  b^{3, 243}_0 ∨  p_729 ∨ break
c  in DIMACS:
-7118 -7119  7120  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 243}_2 ∧ -b^{3, 243}_1 ∧ -b^{3, 243}_0 ∧ true) 
c  in CNF:
c    -b^{3, 243}_2 ∨  b^{3, 243}_1 ∨  b^{3, 243}_0 ∨ false 
c  in DIMACS:
-7118  7119  7120  0

c  3 does not represent an automaton state.
c    -(-b^{3, 243}_2 ∧  b^{3, 243}_1 ∧  b^{3, 243}_0 ∧ true) 
c  in CNF:
c     b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ false 
c  in DIMACS:
 7118 -7119 -7120  0
c  -3 does not represent an automaton state.
c    -( b^{3, 243}_2 ∧  b^{3, 243}_1 ∧  b^{3, 243}_0 ∧ true) 
c  in CNF:
c    -b^{3, 243}_2 ∨ -b^{3, 243}_1 ∨ -b^{3, 243}_0 ∨ false 
c  in DIMACS:
-7118 -7119 -7120  0

c i = 244
c  -2+1 --> -1
c    ( b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧  p_732) -> ( b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0)
c  in CNF:
c    -b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨  b^{3, 245}_2
c    -b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_1
c    -b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨  b^{3, 245}_0
c  in DIMACS:
-7121 -7122  7123 -732  7124 0
-7121 -7122  7123 -732 -7125 0
-7121 -7122  7123 -732  7126 0

c  -1+1 --> 0
c    ( b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0 ∧  p_732) -> (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧ -b^{3, 245}_0)
c  in CNF:
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_2
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_1
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_0
c  in DIMACS:
-7121  7122 -7123 -732 -7124 0
-7121  7122 -7123 -732 -7125 0
-7121  7122 -7123 -732 -7126 0

c  0+1 --> 1
c    (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧  p_732) -> (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0)
c  in CNF:
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_2
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_1
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨  b^{3, 245}_0
c  in DIMACS:
 7121  7122  7123 -732 -7124 0
 7121  7122  7123 -732 -7125 0
 7121  7122  7123 -732  7126 0

c  1+1 --> 2
c    (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0 ∧  p_732) -> (-b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0)
c  in CNF:
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_2
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨  b^{3, 245}_1
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ -p_732 ∨ -b^{3, 245}_0
c  in DIMACS:
 7121  7122 -7123 -732 -7124 0
 7121  7122 -7123 -732  7125 0
 7121  7122 -7123 -732 -7126 0

c  2+1 --> break 
c    (-b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧  p_732) -> break
c  in CNF:
c     b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 7121 -7122  7123 -732 1162 0


c  2-1 --> 1
c    (-b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧ -p_732) -> (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0)
c  in CNF:
c     b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_2
c     b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_1
c     b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨  b^{3, 245}_0
c  in DIMACS:
 7121 -7122  7123  732 -7124 0
 7121 -7122  7123  732 -7125 0
 7121 -7122  7123  732  7126 0

c  1-1 --> 0
c    (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0 ∧ -p_732) -> (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧ -b^{3, 245}_0)
c  in CNF:
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_2
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_1
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_0
c  in DIMACS:
 7121  7122 -7123  732 -7124 0
 7121  7122 -7123  732 -7125 0
 7121  7122 -7123  732 -7126 0

c  0-1 --> -1
c    (-b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧ -p_732) -> ( b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0)
c  in CNF:
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨  b^{3, 245}_2
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_1
c     b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨  b^{3, 245}_0
c  in DIMACS:
 7121  7122  7123  732  7124 0
 7121  7122  7123  732 -7125 0
 7121  7122  7123  732  7126 0

c  -1-1 --> -2
c    ( b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧  b^{3, 244}_0 ∧ -p_732) -> ( b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0)
c  in CNF:
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨  b^{3, 245}_2
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨  b^{3, 245}_1
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨  p_732 ∨ -b^{3, 245}_0
c  in DIMACS:
-7121  7122 -7123  732  7124 0
-7121  7122 -7123  732  7125 0
-7121  7122 -7123  732 -7126 0

c  -2-1 --> break 
c    ( b^{3, 244}_2 ∧  b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨  b^{3, 244}_0 ∨  p_732 ∨ break
c  in DIMACS:
-7121 -7122  7123  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 244}_2 ∧ -b^{3, 244}_1 ∧ -b^{3, 244}_0 ∧ true) 
c  in CNF:
c    -b^{3, 244}_2 ∨  b^{3, 244}_1 ∨  b^{3, 244}_0 ∨ false 
c  in DIMACS:
-7121  7122  7123  0

c  3 does not represent an automaton state.
c    -(-b^{3, 244}_2 ∧  b^{3, 244}_1 ∧  b^{3, 244}_0 ∧ true) 
c  in CNF:
c     b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ false 
c  in DIMACS:
 7121 -7122 -7123  0
c  -3 does not represent an automaton state.
c    -( b^{3, 244}_2 ∧  b^{3, 244}_1 ∧  b^{3, 244}_0 ∧ true) 
c  in CNF:
c    -b^{3, 244}_2 ∨ -b^{3, 244}_1 ∨ -b^{3, 244}_0 ∨ false 
c  in DIMACS:
-7121 -7122 -7123  0

c i = 245
c  -2+1 --> -1
c    ( b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧  p_735) -> ( b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0)
c  in CNF:
c    -b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨  b^{3, 246}_2
c    -b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_1
c    -b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨  b^{3, 246}_0
c  in DIMACS:
-7124 -7125  7126 -735  7127 0
-7124 -7125  7126 -735 -7128 0
-7124 -7125  7126 -735  7129 0

c  -1+1 --> 0
c    ( b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0 ∧  p_735) -> (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧ -b^{3, 246}_0)
c  in CNF:
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_2
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_1
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_0
c  in DIMACS:
-7124  7125 -7126 -735 -7127 0
-7124  7125 -7126 -735 -7128 0
-7124  7125 -7126 -735 -7129 0

c  0+1 --> 1
c    (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧  p_735) -> (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0)
c  in CNF:
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_2
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_1
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨  b^{3, 246}_0
c  in DIMACS:
 7124  7125  7126 -735 -7127 0
 7124  7125  7126 -735 -7128 0
 7124  7125  7126 -735  7129 0

c  1+1 --> 2
c    (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0 ∧  p_735) -> (-b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0)
c  in CNF:
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_2
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨  b^{3, 246}_1
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ -p_735 ∨ -b^{3, 246}_0
c  in DIMACS:
 7124  7125 -7126 -735 -7127 0
 7124  7125 -7126 -735  7128 0
 7124  7125 -7126 -735 -7129 0

c  2+1 --> break 
c    (-b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧  p_735) -> break
c  in CNF:
c     b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 7124 -7125  7126 -735 1162 0


c  2-1 --> 1
c    (-b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧ -p_735) -> (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0)
c  in CNF:
c     b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_2
c     b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_1
c     b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨  b^{3, 246}_0
c  in DIMACS:
 7124 -7125  7126  735 -7127 0
 7124 -7125  7126  735 -7128 0
 7124 -7125  7126  735  7129 0

c  1-1 --> 0
c    (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0 ∧ -p_735) -> (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧ -b^{3, 246}_0)
c  in CNF:
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_2
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_1
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_0
c  in DIMACS:
 7124  7125 -7126  735 -7127 0
 7124  7125 -7126  735 -7128 0
 7124  7125 -7126  735 -7129 0

c  0-1 --> -1
c    (-b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧ -p_735) -> ( b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0)
c  in CNF:
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨  b^{3, 246}_2
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_1
c     b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨  b^{3, 246}_0
c  in DIMACS:
 7124  7125  7126  735  7127 0
 7124  7125  7126  735 -7128 0
 7124  7125  7126  735  7129 0

c  -1-1 --> -2
c    ( b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧  b^{3, 245}_0 ∧ -p_735) -> ( b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0)
c  in CNF:
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨  b^{3, 246}_2
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨  b^{3, 246}_1
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨  p_735 ∨ -b^{3, 246}_0
c  in DIMACS:
-7124  7125 -7126  735  7127 0
-7124  7125 -7126  735  7128 0
-7124  7125 -7126  735 -7129 0

c  -2-1 --> break 
c    ( b^{3, 245}_2 ∧  b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨  b^{3, 245}_0 ∨  p_735 ∨ break
c  in DIMACS:
-7124 -7125  7126  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 245}_2 ∧ -b^{3, 245}_1 ∧ -b^{3, 245}_0 ∧ true) 
c  in CNF:
c    -b^{3, 245}_2 ∨  b^{3, 245}_1 ∨  b^{3, 245}_0 ∨ false 
c  in DIMACS:
-7124  7125  7126  0

c  3 does not represent an automaton state.
c    -(-b^{3, 245}_2 ∧  b^{3, 245}_1 ∧  b^{3, 245}_0 ∧ true) 
c  in CNF:
c     b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ false 
c  in DIMACS:
 7124 -7125 -7126  0
c  -3 does not represent an automaton state.
c    -( b^{3, 245}_2 ∧  b^{3, 245}_1 ∧  b^{3, 245}_0 ∧ true) 
c  in CNF:
c    -b^{3, 245}_2 ∨ -b^{3, 245}_1 ∨ -b^{3, 245}_0 ∨ false 
c  in DIMACS:
-7124 -7125 -7126  0

c i = 246
c  -2+1 --> -1
c    ( b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧  p_738) -> ( b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0)
c  in CNF:
c    -b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨  b^{3, 247}_2
c    -b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_1
c    -b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨  b^{3, 247}_0
c  in DIMACS:
-7127 -7128  7129 -738  7130 0
-7127 -7128  7129 -738 -7131 0
-7127 -7128  7129 -738  7132 0

c  -1+1 --> 0
c    ( b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0 ∧  p_738) -> (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧ -b^{3, 247}_0)
c  in CNF:
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_2
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_1
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_0
c  in DIMACS:
-7127  7128 -7129 -738 -7130 0
-7127  7128 -7129 -738 -7131 0
-7127  7128 -7129 -738 -7132 0

c  0+1 --> 1
c    (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧  p_738) -> (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0)
c  in CNF:
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_2
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_1
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨  b^{3, 247}_0
c  in DIMACS:
 7127  7128  7129 -738 -7130 0
 7127  7128  7129 -738 -7131 0
 7127  7128  7129 -738  7132 0

c  1+1 --> 2
c    (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0 ∧  p_738) -> (-b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0)
c  in CNF:
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_2
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨  b^{3, 247}_1
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ -p_738 ∨ -b^{3, 247}_0
c  in DIMACS:
 7127  7128 -7129 -738 -7130 0
 7127  7128 -7129 -738  7131 0
 7127  7128 -7129 -738 -7132 0

c  2+1 --> break 
c    (-b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧  p_738) -> break
c  in CNF:
c     b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 7127 -7128  7129 -738 1162 0


c  2-1 --> 1
c    (-b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧ -p_738) -> (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0)
c  in CNF:
c     b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_2
c     b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_1
c     b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨  b^{3, 247}_0
c  in DIMACS:
 7127 -7128  7129  738 -7130 0
 7127 -7128  7129  738 -7131 0
 7127 -7128  7129  738  7132 0

c  1-1 --> 0
c    (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0 ∧ -p_738) -> (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧ -b^{3, 247}_0)
c  in CNF:
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_2
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_1
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_0
c  in DIMACS:
 7127  7128 -7129  738 -7130 0
 7127  7128 -7129  738 -7131 0
 7127  7128 -7129  738 -7132 0

c  0-1 --> -1
c    (-b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧ -p_738) -> ( b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0)
c  in CNF:
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨  b^{3, 247}_2
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_1
c     b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨  b^{3, 247}_0
c  in DIMACS:
 7127  7128  7129  738  7130 0
 7127  7128  7129  738 -7131 0
 7127  7128  7129  738  7132 0

c  -1-1 --> -2
c    ( b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧  b^{3, 246}_0 ∧ -p_738) -> ( b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0)
c  in CNF:
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨  b^{3, 247}_2
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨  b^{3, 247}_1
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨  p_738 ∨ -b^{3, 247}_0
c  in DIMACS:
-7127  7128 -7129  738  7130 0
-7127  7128 -7129  738  7131 0
-7127  7128 -7129  738 -7132 0

c  -2-1 --> break 
c    ( b^{3, 246}_2 ∧  b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨  b^{3, 246}_0 ∨  p_738 ∨ break
c  in DIMACS:
-7127 -7128  7129  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 246}_2 ∧ -b^{3, 246}_1 ∧ -b^{3, 246}_0 ∧ true) 
c  in CNF:
c    -b^{3, 246}_2 ∨  b^{3, 246}_1 ∨  b^{3, 246}_0 ∨ false 
c  in DIMACS:
-7127  7128  7129  0

c  3 does not represent an automaton state.
c    -(-b^{3, 246}_2 ∧  b^{3, 246}_1 ∧  b^{3, 246}_0 ∧ true) 
c  in CNF:
c     b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ false 
c  in DIMACS:
 7127 -7128 -7129  0
c  -3 does not represent an automaton state.
c    -( b^{3, 246}_2 ∧  b^{3, 246}_1 ∧  b^{3, 246}_0 ∧ true) 
c  in CNF:
c    -b^{3, 246}_2 ∨ -b^{3, 246}_1 ∨ -b^{3, 246}_0 ∨ false 
c  in DIMACS:
-7127 -7128 -7129  0

c i = 247
c  -2+1 --> -1
c    ( b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧  p_741) -> ( b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0)
c  in CNF:
c    -b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨  b^{3, 248}_2
c    -b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_1
c    -b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨  b^{3, 248}_0
c  in DIMACS:
-7130 -7131  7132 -741  7133 0
-7130 -7131  7132 -741 -7134 0
-7130 -7131  7132 -741  7135 0

c  -1+1 --> 0
c    ( b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0 ∧  p_741) -> (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧ -b^{3, 248}_0)
c  in CNF:
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_2
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_1
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_0
c  in DIMACS:
-7130  7131 -7132 -741 -7133 0
-7130  7131 -7132 -741 -7134 0
-7130  7131 -7132 -741 -7135 0

c  0+1 --> 1
c    (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧  p_741) -> (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0)
c  in CNF:
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_2
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_1
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨  b^{3, 248}_0
c  in DIMACS:
 7130  7131  7132 -741 -7133 0
 7130  7131  7132 -741 -7134 0
 7130  7131  7132 -741  7135 0

c  1+1 --> 2
c    (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0 ∧  p_741) -> (-b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0)
c  in CNF:
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_2
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨  b^{3, 248}_1
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ -p_741 ∨ -b^{3, 248}_0
c  in DIMACS:
 7130  7131 -7132 -741 -7133 0
 7130  7131 -7132 -741  7134 0
 7130  7131 -7132 -741 -7135 0

c  2+1 --> break 
c    (-b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧  p_741) -> break
c  in CNF:
c     b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 7130 -7131  7132 -741 1162 0


c  2-1 --> 1
c    (-b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧ -p_741) -> (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0)
c  in CNF:
c     b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_2
c     b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_1
c     b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨  b^{3, 248}_0
c  in DIMACS:
 7130 -7131  7132  741 -7133 0
 7130 -7131  7132  741 -7134 0
 7130 -7131  7132  741  7135 0

c  1-1 --> 0
c    (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0 ∧ -p_741) -> (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧ -b^{3, 248}_0)
c  in CNF:
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_2
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_1
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_0
c  in DIMACS:
 7130  7131 -7132  741 -7133 0
 7130  7131 -7132  741 -7134 0
 7130  7131 -7132  741 -7135 0

c  0-1 --> -1
c    (-b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧ -p_741) -> ( b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0)
c  in CNF:
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨  b^{3, 248}_2
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_1
c     b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨  b^{3, 248}_0
c  in DIMACS:
 7130  7131  7132  741  7133 0
 7130  7131  7132  741 -7134 0
 7130  7131  7132  741  7135 0

c  -1-1 --> -2
c    ( b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧  b^{3, 247}_0 ∧ -p_741) -> ( b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0)
c  in CNF:
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨  b^{3, 248}_2
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨  b^{3, 248}_1
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨  p_741 ∨ -b^{3, 248}_0
c  in DIMACS:
-7130  7131 -7132  741  7133 0
-7130  7131 -7132  741  7134 0
-7130  7131 -7132  741 -7135 0

c  -2-1 --> break 
c    ( b^{3, 247}_2 ∧  b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨  b^{3, 247}_0 ∨  p_741 ∨ break
c  in DIMACS:
-7130 -7131  7132  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 247}_2 ∧ -b^{3, 247}_1 ∧ -b^{3, 247}_0 ∧ true) 
c  in CNF:
c    -b^{3, 247}_2 ∨  b^{3, 247}_1 ∨  b^{3, 247}_0 ∨ false 
c  in DIMACS:
-7130  7131  7132  0

c  3 does not represent an automaton state.
c    -(-b^{3, 247}_2 ∧  b^{3, 247}_1 ∧  b^{3, 247}_0 ∧ true) 
c  in CNF:
c     b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ false 
c  in DIMACS:
 7130 -7131 -7132  0
c  -3 does not represent an automaton state.
c    -( b^{3, 247}_2 ∧  b^{3, 247}_1 ∧  b^{3, 247}_0 ∧ true) 
c  in CNF:
c    -b^{3, 247}_2 ∨ -b^{3, 247}_1 ∨ -b^{3, 247}_0 ∨ false 
c  in DIMACS:
-7130 -7131 -7132  0

c i = 248
c  -2+1 --> -1
c    ( b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧  p_744) -> ( b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0)
c  in CNF:
c    -b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨  b^{3, 249}_2
c    -b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_1
c    -b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨  b^{3, 249}_0
c  in DIMACS:
-7133 -7134  7135 -744  7136 0
-7133 -7134  7135 -744 -7137 0
-7133 -7134  7135 -744  7138 0

c  -1+1 --> 0
c    ( b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0 ∧  p_744) -> (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧ -b^{3, 249}_0)
c  in CNF:
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_2
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_1
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_0
c  in DIMACS:
-7133  7134 -7135 -744 -7136 0
-7133  7134 -7135 -744 -7137 0
-7133  7134 -7135 -744 -7138 0

c  0+1 --> 1
c    (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧  p_744) -> (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0)
c  in CNF:
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_2
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_1
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨  b^{3, 249}_0
c  in DIMACS:
 7133  7134  7135 -744 -7136 0
 7133  7134  7135 -744 -7137 0
 7133  7134  7135 -744  7138 0

c  1+1 --> 2
c    (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0 ∧  p_744) -> (-b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0)
c  in CNF:
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_2
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨  b^{3, 249}_1
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ -p_744 ∨ -b^{3, 249}_0
c  in DIMACS:
 7133  7134 -7135 -744 -7136 0
 7133  7134 -7135 -744  7137 0
 7133  7134 -7135 -744 -7138 0

c  2+1 --> break 
c    (-b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧  p_744) -> break
c  in CNF:
c     b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 7133 -7134  7135 -744 1162 0


c  2-1 --> 1
c    (-b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧ -p_744) -> (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0)
c  in CNF:
c     b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_2
c     b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_1
c     b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨  b^{3, 249}_0
c  in DIMACS:
 7133 -7134  7135  744 -7136 0
 7133 -7134  7135  744 -7137 0
 7133 -7134  7135  744  7138 0

c  1-1 --> 0
c    (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0 ∧ -p_744) -> (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧ -b^{3, 249}_0)
c  in CNF:
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_2
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_1
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_0
c  in DIMACS:
 7133  7134 -7135  744 -7136 0
 7133  7134 -7135  744 -7137 0
 7133  7134 -7135  744 -7138 0

c  0-1 --> -1
c    (-b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧ -p_744) -> ( b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0)
c  in CNF:
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨  b^{3, 249}_2
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_1
c     b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨  b^{3, 249}_0
c  in DIMACS:
 7133  7134  7135  744  7136 0
 7133  7134  7135  744 -7137 0
 7133  7134  7135  744  7138 0

c  -1-1 --> -2
c    ( b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧  b^{3, 248}_0 ∧ -p_744) -> ( b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0)
c  in CNF:
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨  b^{3, 249}_2
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨  b^{3, 249}_1
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨  p_744 ∨ -b^{3, 249}_0
c  in DIMACS:
-7133  7134 -7135  744  7136 0
-7133  7134 -7135  744  7137 0
-7133  7134 -7135  744 -7138 0

c  -2-1 --> break 
c    ( b^{3, 248}_2 ∧  b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨  b^{3, 248}_0 ∨  p_744 ∨ break
c  in DIMACS:
-7133 -7134  7135  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 248}_2 ∧ -b^{3, 248}_1 ∧ -b^{3, 248}_0 ∧ true) 
c  in CNF:
c    -b^{3, 248}_2 ∨  b^{3, 248}_1 ∨  b^{3, 248}_0 ∨ false 
c  in DIMACS:
-7133  7134  7135  0

c  3 does not represent an automaton state.
c    -(-b^{3, 248}_2 ∧  b^{3, 248}_1 ∧  b^{3, 248}_0 ∧ true) 
c  in CNF:
c     b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ false 
c  in DIMACS:
 7133 -7134 -7135  0
c  -3 does not represent an automaton state.
c    -( b^{3, 248}_2 ∧  b^{3, 248}_1 ∧  b^{3, 248}_0 ∧ true) 
c  in CNF:
c    -b^{3, 248}_2 ∨ -b^{3, 248}_1 ∨ -b^{3, 248}_0 ∨ false 
c  in DIMACS:
-7133 -7134 -7135  0

c i = 249
c  -2+1 --> -1
c    ( b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧  p_747) -> ( b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0)
c  in CNF:
c    -b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨  b^{3, 250}_2
c    -b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_1
c    -b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨  b^{3, 250}_0
c  in DIMACS:
-7136 -7137  7138 -747  7139 0
-7136 -7137  7138 -747 -7140 0
-7136 -7137  7138 -747  7141 0

c  -1+1 --> 0
c    ( b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0 ∧  p_747) -> (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧ -b^{3, 250}_0)
c  in CNF:
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_2
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_1
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_0
c  in DIMACS:
-7136  7137 -7138 -747 -7139 0
-7136  7137 -7138 -747 -7140 0
-7136  7137 -7138 -747 -7141 0

c  0+1 --> 1
c    (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧  p_747) -> (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0)
c  in CNF:
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_2
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_1
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨  b^{3, 250}_0
c  in DIMACS:
 7136  7137  7138 -747 -7139 0
 7136  7137  7138 -747 -7140 0
 7136  7137  7138 -747  7141 0

c  1+1 --> 2
c    (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0 ∧  p_747) -> (-b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0)
c  in CNF:
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_2
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨  b^{3, 250}_1
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ -p_747 ∨ -b^{3, 250}_0
c  in DIMACS:
 7136  7137 -7138 -747 -7139 0
 7136  7137 -7138 -747  7140 0
 7136  7137 -7138 -747 -7141 0

c  2+1 --> break 
c    (-b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧  p_747) -> break
c  in CNF:
c     b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ -p_747 ∨ break
c  in DIMACS:
 7136 -7137  7138 -747 1162 0


c  2-1 --> 1
c    (-b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧ -p_747) -> (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0)
c  in CNF:
c     b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_2
c     b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_1
c     b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨  b^{3, 250}_0
c  in DIMACS:
 7136 -7137  7138  747 -7139 0
 7136 -7137  7138  747 -7140 0
 7136 -7137  7138  747  7141 0

c  1-1 --> 0
c    (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0 ∧ -p_747) -> (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧ -b^{3, 250}_0)
c  in CNF:
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_2
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_1
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_0
c  in DIMACS:
 7136  7137 -7138  747 -7139 0
 7136  7137 -7138  747 -7140 0
 7136  7137 -7138  747 -7141 0

c  0-1 --> -1
c    (-b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧ -p_747) -> ( b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0)
c  in CNF:
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨  b^{3, 250}_2
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_1
c     b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨  b^{3, 250}_0
c  in DIMACS:
 7136  7137  7138  747  7139 0
 7136  7137  7138  747 -7140 0
 7136  7137  7138  747  7141 0

c  -1-1 --> -2
c    ( b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧  b^{3, 249}_0 ∧ -p_747) -> ( b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0)
c  in CNF:
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨  b^{3, 250}_2
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨  b^{3, 250}_1
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨  p_747 ∨ -b^{3, 250}_0
c  in DIMACS:
-7136  7137 -7138  747  7139 0
-7136  7137 -7138  747  7140 0
-7136  7137 -7138  747 -7141 0

c  -2-1 --> break 
c    ( b^{3, 249}_2 ∧  b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧ -p_747) -> break
c  in CNF:
c    -b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨  b^{3, 249}_0 ∨  p_747 ∨ break
c  in DIMACS:
-7136 -7137  7138  747 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 249}_2 ∧ -b^{3, 249}_1 ∧ -b^{3, 249}_0 ∧ true) 
c  in CNF:
c    -b^{3, 249}_2 ∨  b^{3, 249}_1 ∨  b^{3, 249}_0 ∨ false 
c  in DIMACS:
-7136  7137  7138  0

c  3 does not represent an automaton state.
c    -(-b^{3, 249}_2 ∧  b^{3, 249}_1 ∧  b^{3, 249}_0 ∧ true) 
c  in CNF:
c     b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ false 
c  in DIMACS:
 7136 -7137 -7138  0
c  -3 does not represent an automaton state.
c    -( b^{3, 249}_2 ∧  b^{3, 249}_1 ∧  b^{3, 249}_0 ∧ true) 
c  in CNF:
c    -b^{3, 249}_2 ∨ -b^{3, 249}_1 ∨ -b^{3, 249}_0 ∨ false 
c  in DIMACS:
-7136 -7137 -7138  0

c i = 250
c  -2+1 --> -1
c    ( b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧  p_750) -> ( b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0)
c  in CNF:
c    -b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨  b^{3, 251}_2
c    -b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_1
c    -b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨  b^{3, 251}_0
c  in DIMACS:
-7139 -7140  7141 -750  7142 0
-7139 -7140  7141 -750 -7143 0
-7139 -7140  7141 -750  7144 0

c  -1+1 --> 0
c    ( b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0 ∧  p_750) -> (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧ -b^{3, 251}_0)
c  in CNF:
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_2
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_1
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_0
c  in DIMACS:
-7139  7140 -7141 -750 -7142 0
-7139  7140 -7141 -750 -7143 0
-7139  7140 -7141 -750 -7144 0

c  0+1 --> 1
c    (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧  p_750) -> (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0)
c  in CNF:
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_2
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_1
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨  b^{3, 251}_0
c  in DIMACS:
 7139  7140  7141 -750 -7142 0
 7139  7140  7141 -750 -7143 0
 7139  7140  7141 -750  7144 0

c  1+1 --> 2
c    (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0 ∧  p_750) -> (-b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0)
c  in CNF:
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_2
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨  b^{3, 251}_1
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ -p_750 ∨ -b^{3, 251}_0
c  in DIMACS:
 7139  7140 -7141 -750 -7142 0
 7139  7140 -7141 -750  7143 0
 7139  7140 -7141 -750 -7144 0

c  2+1 --> break 
c    (-b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧  p_750) -> break
c  in CNF:
c     b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 7139 -7140  7141 -750 1162 0


c  2-1 --> 1
c    (-b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧ -p_750) -> (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0)
c  in CNF:
c     b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_2
c     b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_1
c     b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨  b^{3, 251}_0
c  in DIMACS:
 7139 -7140  7141  750 -7142 0
 7139 -7140  7141  750 -7143 0
 7139 -7140  7141  750  7144 0

c  1-1 --> 0
c    (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0 ∧ -p_750) -> (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧ -b^{3, 251}_0)
c  in CNF:
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_2
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_1
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_0
c  in DIMACS:
 7139  7140 -7141  750 -7142 0
 7139  7140 -7141  750 -7143 0
 7139  7140 -7141  750 -7144 0

c  0-1 --> -1
c    (-b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧ -p_750) -> ( b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0)
c  in CNF:
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨  b^{3, 251}_2
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_1
c     b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨  b^{3, 251}_0
c  in DIMACS:
 7139  7140  7141  750  7142 0
 7139  7140  7141  750 -7143 0
 7139  7140  7141  750  7144 0

c  -1-1 --> -2
c    ( b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧  b^{3, 250}_0 ∧ -p_750) -> ( b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0)
c  in CNF:
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨  b^{3, 251}_2
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨  b^{3, 251}_1
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨  p_750 ∨ -b^{3, 251}_0
c  in DIMACS:
-7139  7140 -7141  750  7142 0
-7139  7140 -7141  750  7143 0
-7139  7140 -7141  750 -7144 0

c  -2-1 --> break 
c    ( b^{3, 250}_2 ∧  b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨  b^{3, 250}_0 ∨  p_750 ∨ break
c  in DIMACS:
-7139 -7140  7141  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 250}_2 ∧ -b^{3, 250}_1 ∧ -b^{3, 250}_0 ∧ true) 
c  in CNF:
c    -b^{3, 250}_2 ∨  b^{3, 250}_1 ∨  b^{3, 250}_0 ∨ false 
c  in DIMACS:
-7139  7140  7141  0

c  3 does not represent an automaton state.
c    -(-b^{3, 250}_2 ∧  b^{3, 250}_1 ∧  b^{3, 250}_0 ∧ true) 
c  in CNF:
c     b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ false 
c  in DIMACS:
 7139 -7140 -7141  0
c  -3 does not represent an automaton state.
c    -( b^{3, 250}_2 ∧  b^{3, 250}_1 ∧  b^{3, 250}_0 ∧ true) 
c  in CNF:
c    -b^{3, 250}_2 ∨ -b^{3, 250}_1 ∨ -b^{3, 250}_0 ∨ false 
c  in DIMACS:
-7139 -7140 -7141  0

c i = 251
c  -2+1 --> -1
c    ( b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧  p_753) -> ( b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0)
c  in CNF:
c    -b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨  b^{3, 252}_2
c    -b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_1
c    -b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨  b^{3, 252}_0
c  in DIMACS:
-7142 -7143  7144 -753  7145 0
-7142 -7143  7144 -753 -7146 0
-7142 -7143  7144 -753  7147 0

c  -1+1 --> 0
c    ( b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0 ∧  p_753) -> (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧ -b^{3, 252}_0)
c  in CNF:
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_2
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_1
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_0
c  in DIMACS:
-7142  7143 -7144 -753 -7145 0
-7142  7143 -7144 -753 -7146 0
-7142  7143 -7144 -753 -7147 0

c  0+1 --> 1
c    (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧  p_753) -> (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0)
c  in CNF:
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_2
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_1
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨  b^{3, 252}_0
c  in DIMACS:
 7142  7143  7144 -753 -7145 0
 7142  7143  7144 -753 -7146 0
 7142  7143  7144 -753  7147 0

c  1+1 --> 2
c    (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0 ∧  p_753) -> (-b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0)
c  in CNF:
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_2
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨  b^{3, 252}_1
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ -p_753 ∨ -b^{3, 252}_0
c  in DIMACS:
 7142  7143 -7144 -753 -7145 0
 7142  7143 -7144 -753  7146 0
 7142  7143 -7144 -753 -7147 0

c  2+1 --> break 
c    (-b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧  p_753) -> break
c  in CNF:
c     b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ -p_753 ∨ break
c  in DIMACS:
 7142 -7143  7144 -753 1162 0


c  2-1 --> 1
c    (-b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧ -p_753) -> (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0)
c  in CNF:
c     b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_2
c     b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_1
c     b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨  b^{3, 252}_0
c  in DIMACS:
 7142 -7143  7144  753 -7145 0
 7142 -7143  7144  753 -7146 0
 7142 -7143  7144  753  7147 0

c  1-1 --> 0
c    (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0 ∧ -p_753) -> (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧ -b^{3, 252}_0)
c  in CNF:
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_2
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_1
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_0
c  in DIMACS:
 7142  7143 -7144  753 -7145 0
 7142  7143 -7144  753 -7146 0
 7142  7143 -7144  753 -7147 0

c  0-1 --> -1
c    (-b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧ -p_753) -> ( b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0)
c  in CNF:
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨  b^{3, 252}_2
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_1
c     b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨  b^{3, 252}_0
c  in DIMACS:
 7142  7143  7144  753  7145 0
 7142  7143  7144  753 -7146 0
 7142  7143  7144  753  7147 0

c  -1-1 --> -2
c    ( b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧  b^{3, 251}_0 ∧ -p_753) -> ( b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0)
c  in CNF:
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨  b^{3, 252}_2
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨  b^{3, 252}_1
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨  p_753 ∨ -b^{3, 252}_0
c  in DIMACS:
-7142  7143 -7144  753  7145 0
-7142  7143 -7144  753  7146 0
-7142  7143 -7144  753 -7147 0

c  -2-1 --> break 
c    ( b^{3, 251}_2 ∧  b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧ -p_753) -> break
c  in CNF:
c    -b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨  b^{3, 251}_0 ∨  p_753 ∨ break
c  in DIMACS:
-7142 -7143  7144  753 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 251}_2 ∧ -b^{3, 251}_1 ∧ -b^{3, 251}_0 ∧ true) 
c  in CNF:
c    -b^{3, 251}_2 ∨  b^{3, 251}_1 ∨  b^{3, 251}_0 ∨ false 
c  in DIMACS:
-7142  7143  7144  0

c  3 does not represent an automaton state.
c    -(-b^{3, 251}_2 ∧  b^{3, 251}_1 ∧  b^{3, 251}_0 ∧ true) 
c  in CNF:
c     b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ false 
c  in DIMACS:
 7142 -7143 -7144  0
c  -3 does not represent an automaton state.
c    -( b^{3, 251}_2 ∧  b^{3, 251}_1 ∧  b^{3, 251}_0 ∧ true) 
c  in CNF:
c    -b^{3, 251}_2 ∨ -b^{3, 251}_1 ∨ -b^{3, 251}_0 ∨ false 
c  in DIMACS:
-7142 -7143 -7144  0

c i = 252
c  -2+1 --> -1
c    ( b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧  p_756) -> ( b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0)
c  in CNF:
c    -b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨  b^{3, 253}_2
c    -b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_1
c    -b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨  b^{3, 253}_0
c  in DIMACS:
-7145 -7146  7147 -756  7148 0
-7145 -7146  7147 -756 -7149 0
-7145 -7146  7147 -756  7150 0

c  -1+1 --> 0
c    ( b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0 ∧  p_756) -> (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧ -b^{3, 253}_0)
c  in CNF:
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_2
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_1
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_0
c  in DIMACS:
-7145  7146 -7147 -756 -7148 0
-7145  7146 -7147 -756 -7149 0
-7145  7146 -7147 -756 -7150 0

c  0+1 --> 1
c    (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧  p_756) -> (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0)
c  in CNF:
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_2
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_1
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨  b^{3, 253}_0
c  in DIMACS:
 7145  7146  7147 -756 -7148 0
 7145  7146  7147 -756 -7149 0
 7145  7146  7147 -756  7150 0

c  1+1 --> 2
c    (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0 ∧  p_756) -> (-b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0)
c  in CNF:
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_2
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨  b^{3, 253}_1
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ -p_756 ∨ -b^{3, 253}_0
c  in DIMACS:
 7145  7146 -7147 -756 -7148 0
 7145  7146 -7147 -756  7149 0
 7145  7146 -7147 -756 -7150 0

c  2+1 --> break 
c    (-b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧  p_756) -> break
c  in CNF:
c     b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 7145 -7146  7147 -756 1162 0


c  2-1 --> 1
c    (-b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧ -p_756) -> (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0)
c  in CNF:
c     b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_2
c     b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_1
c     b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨  b^{3, 253}_0
c  in DIMACS:
 7145 -7146  7147  756 -7148 0
 7145 -7146  7147  756 -7149 0
 7145 -7146  7147  756  7150 0

c  1-1 --> 0
c    (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0 ∧ -p_756) -> (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧ -b^{3, 253}_0)
c  in CNF:
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_2
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_1
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_0
c  in DIMACS:
 7145  7146 -7147  756 -7148 0
 7145  7146 -7147  756 -7149 0
 7145  7146 -7147  756 -7150 0

c  0-1 --> -1
c    (-b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧ -p_756) -> ( b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0)
c  in CNF:
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨  b^{3, 253}_2
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_1
c     b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨  b^{3, 253}_0
c  in DIMACS:
 7145  7146  7147  756  7148 0
 7145  7146  7147  756 -7149 0
 7145  7146  7147  756  7150 0

c  -1-1 --> -2
c    ( b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧  b^{3, 252}_0 ∧ -p_756) -> ( b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0)
c  in CNF:
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨  b^{3, 253}_2
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨  b^{3, 253}_1
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨  p_756 ∨ -b^{3, 253}_0
c  in DIMACS:
-7145  7146 -7147  756  7148 0
-7145  7146 -7147  756  7149 0
-7145  7146 -7147  756 -7150 0

c  -2-1 --> break 
c    ( b^{3, 252}_2 ∧  b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨  b^{3, 252}_0 ∨  p_756 ∨ break
c  in DIMACS:
-7145 -7146  7147  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 252}_2 ∧ -b^{3, 252}_1 ∧ -b^{3, 252}_0 ∧ true) 
c  in CNF:
c    -b^{3, 252}_2 ∨  b^{3, 252}_1 ∨  b^{3, 252}_0 ∨ false 
c  in DIMACS:
-7145  7146  7147  0

c  3 does not represent an automaton state.
c    -(-b^{3, 252}_2 ∧  b^{3, 252}_1 ∧  b^{3, 252}_0 ∧ true) 
c  in CNF:
c     b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ false 
c  in DIMACS:
 7145 -7146 -7147  0
c  -3 does not represent an automaton state.
c    -( b^{3, 252}_2 ∧  b^{3, 252}_1 ∧  b^{3, 252}_0 ∧ true) 
c  in CNF:
c    -b^{3, 252}_2 ∨ -b^{3, 252}_1 ∨ -b^{3, 252}_0 ∨ false 
c  in DIMACS:
-7145 -7146 -7147  0

c i = 253
c  -2+1 --> -1
c    ( b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧  p_759) -> ( b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0)
c  in CNF:
c    -b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨  b^{3, 254}_2
c    -b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_1
c    -b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨  b^{3, 254}_0
c  in DIMACS:
-7148 -7149  7150 -759  7151 0
-7148 -7149  7150 -759 -7152 0
-7148 -7149  7150 -759  7153 0

c  -1+1 --> 0
c    ( b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0 ∧  p_759) -> (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧ -b^{3, 254}_0)
c  in CNF:
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_2
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_1
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_0
c  in DIMACS:
-7148  7149 -7150 -759 -7151 0
-7148  7149 -7150 -759 -7152 0
-7148  7149 -7150 -759 -7153 0

c  0+1 --> 1
c    (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧  p_759) -> (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0)
c  in CNF:
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_2
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_1
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨  b^{3, 254}_0
c  in DIMACS:
 7148  7149  7150 -759 -7151 0
 7148  7149  7150 -759 -7152 0
 7148  7149  7150 -759  7153 0

c  1+1 --> 2
c    (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0 ∧  p_759) -> (-b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0)
c  in CNF:
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_2
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨  b^{3, 254}_1
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ -p_759 ∨ -b^{3, 254}_0
c  in DIMACS:
 7148  7149 -7150 -759 -7151 0
 7148  7149 -7150 -759  7152 0
 7148  7149 -7150 -759 -7153 0

c  2+1 --> break 
c    (-b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧  p_759) -> break
c  in CNF:
c     b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 7148 -7149  7150 -759 1162 0


c  2-1 --> 1
c    (-b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧ -p_759) -> (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0)
c  in CNF:
c     b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_2
c     b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_1
c     b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨  b^{3, 254}_0
c  in DIMACS:
 7148 -7149  7150  759 -7151 0
 7148 -7149  7150  759 -7152 0
 7148 -7149  7150  759  7153 0

c  1-1 --> 0
c    (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0 ∧ -p_759) -> (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧ -b^{3, 254}_0)
c  in CNF:
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_2
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_1
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_0
c  in DIMACS:
 7148  7149 -7150  759 -7151 0
 7148  7149 -7150  759 -7152 0
 7148  7149 -7150  759 -7153 0

c  0-1 --> -1
c    (-b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧ -p_759) -> ( b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0)
c  in CNF:
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨  b^{3, 254}_2
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_1
c     b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨  b^{3, 254}_0
c  in DIMACS:
 7148  7149  7150  759  7151 0
 7148  7149  7150  759 -7152 0
 7148  7149  7150  759  7153 0

c  -1-1 --> -2
c    ( b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧  b^{3, 253}_0 ∧ -p_759) -> ( b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0)
c  in CNF:
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨  b^{3, 254}_2
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨  b^{3, 254}_1
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨  p_759 ∨ -b^{3, 254}_0
c  in DIMACS:
-7148  7149 -7150  759  7151 0
-7148  7149 -7150  759  7152 0
-7148  7149 -7150  759 -7153 0

c  -2-1 --> break 
c    ( b^{3, 253}_2 ∧  b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨  b^{3, 253}_0 ∨  p_759 ∨ break
c  in DIMACS:
-7148 -7149  7150  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 253}_2 ∧ -b^{3, 253}_1 ∧ -b^{3, 253}_0 ∧ true) 
c  in CNF:
c    -b^{3, 253}_2 ∨  b^{3, 253}_1 ∨  b^{3, 253}_0 ∨ false 
c  in DIMACS:
-7148  7149  7150  0

c  3 does not represent an automaton state.
c    -(-b^{3, 253}_2 ∧  b^{3, 253}_1 ∧  b^{3, 253}_0 ∧ true) 
c  in CNF:
c     b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ false 
c  in DIMACS:
 7148 -7149 -7150  0
c  -3 does not represent an automaton state.
c    -( b^{3, 253}_2 ∧  b^{3, 253}_1 ∧  b^{3, 253}_0 ∧ true) 
c  in CNF:
c    -b^{3, 253}_2 ∨ -b^{3, 253}_1 ∨ -b^{3, 253}_0 ∨ false 
c  in DIMACS:
-7148 -7149 -7150  0

c i = 254
c  -2+1 --> -1
c    ( b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧  p_762) -> ( b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0)
c  in CNF:
c    -b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨  b^{3, 255}_2
c    -b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_1
c    -b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨  b^{3, 255}_0
c  in DIMACS:
-7151 -7152  7153 -762  7154 0
-7151 -7152  7153 -762 -7155 0
-7151 -7152  7153 -762  7156 0

c  -1+1 --> 0
c    ( b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0 ∧  p_762) -> (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧ -b^{3, 255}_0)
c  in CNF:
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_2
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_1
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_0
c  in DIMACS:
-7151  7152 -7153 -762 -7154 0
-7151  7152 -7153 -762 -7155 0
-7151  7152 -7153 -762 -7156 0

c  0+1 --> 1
c    (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧  p_762) -> (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0)
c  in CNF:
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_2
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_1
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨  b^{3, 255}_0
c  in DIMACS:
 7151  7152  7153 -762 -7154 0
 7151  7152  7153 -762 -7155 0
 7151  7152  7153 -762  7156 0

c  1+1 --> 2
c    (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0 ∧  p_762) -> (-b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0)
c  in CNF:
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_2
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨  b^{3, 255}_1
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ -p_762 ∨ -b^{3, 255}_0
c  in DIMACS:
 7151  7152 -7153 -762 -7154 0
 7151  7152 -7153 -762  7155 0
 7151  7152 -7153 -762 -7156 0

c  2+1 --> break 
c    (-b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧  p_762) -> break
c  in CNF:
c     b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 7151 -7152  7153 -762 1162 0


c  2-1 --> 1
c    (-b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧ -p_762) -> (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0)
c  in CNF:
c     b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_2
c     b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_1
c     b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨  b^{3, 255}_0
c  in DIMACS:
 7151 -7152  7153  762 -7154 0
 7151 -7152  7153  762 -7155 0
 7151 -7152  7153  762  7156 0

c  1-1 --> 0
c    (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0 ∧ -p_762) -> (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧ -b^{3, 255}_0)
c  in CNF:
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_2
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_1
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_0
c  in DIMACS:
 7151  7152 -7153  762 -7154 0
 7151  7152 -7153  762 -7155 0
 7151  7152 -7153  762 -7156 0

c  0-1 --> -1
c    (-b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧ -p_762) -> ( b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0)
c  in CNF:
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨  b^{3, 255}_2
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_1
c     b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨  b^{3, 255}_0
c  in DIMACS:
 7151  7152  7153  762  7154 0
 7151  7152  7153  762 -7155 0
 7151  7152  7153  762  7156 0

c  -1-1 --> -2
c    ( b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧  b^{3, 254}_0 ∧ -p_762) -> ( b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0)
c  in CNF:
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨  b^{3, 255}_2
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨  b^{3, 255}_1
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨  p_762 ∨ -b^{3, 255}_0
c  in DIMACS:
-7151  7152 -7153  762  7154 0
-7151  7152 -7153  762  7155 0
-7151  7152 -7153  762 -7156 0

c  -2-1 --> break 
c    ( b^{3, 254}_2 ∧  b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨  b^{3, 254}_0 ∨  p_762 ∨ break
c  in DIMACS:
-7151 -7152  7153  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 254}_2 ∧ -b^{3, 254}_1 ∧ -b^{3, 254}_0 ∧ true) 
c  in CNF:
c    -b^{3, 254}_2 ∨  b^{3, 254}_1 ∨  b^{3, 254}_0 ∨ false 
c  in DIMACS:
-7151  7152  7153  0

c  3 does not represent an automaton state.
c    -(-b^{3, 254}_2 ∧  b^{3, 254}_1 ∧  b^{3, 254}_0 ∧ true) 
c  in CNF:
c     b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ false 
c  in DIMACS:
 7151 -7152 -7153  0
c  -3 does not represent an automaton state.
c    -( b^{3, 254}_2 ∧  b^{3, 254}_1 ∧  b^{3, 254}_0 ∧ true) 
c  in CNF:
c    -b^{3, 254}_2 ∨ -b^{3, 254}_1 ∨ -b^{3, 254}_0 ∨ false 
c  in DIMACS:
-7151 -7152 -7153  0

c i = 255
c  -2+1 --> -1
c    ( b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧  p_765) -> ( b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0)
c  in CNF:
c    -b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨  b^{3, 256}_2
c    -b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_1
c    -b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨  b^{3, 256}_0
c  in DIMACS:
-7154 -7155  7156 -765  7157 0
-7154 -7155  7156 -765 -7158 0
-7154 -7155  7156 -765  7159 0

c  -1+1 --> 0
c    ( b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0 ∧  p_765) -> (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧ -b^{3, 256}_0)
c  in CNF:
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_2
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_1
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_0
c  in DIMACS:
-7154  7155 -7156 -765 -7157 0
-7154  7155 -7156 -765 -7158 0
-7154  7155 -7156 -765 -7159 0

c  0+1 --> 1
c    (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧  p_765) -> (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0)
c  in CNF:
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_2
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_1
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨  b^{3, 256}_0
c  in DIMACS:
 7154  7155  7156 -765 -7157 0
 7154  7155  7156 -765 -7158 0
 7154  7155  7156 -765  7159 0

c  1+1 --> 2
c    (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0 ∧  p_765) -> (-b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0)
c  in CNF:
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_2
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨  b^{3, 256}_1
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ -p_765 ∨ -b^{3, 256}_0
c  in DIMACS:
 7154  7155 -7156 -765 -7157 0
 7154  7155 -7156 -765  7158 0
 7154  7155 -7156 -765 -7159 0

c  2+1 --> break 
c    (-b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧  p_765) -> break
c  in CNF:
c     b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 7154 -7155  7156 -765 1162 0


c  2-1 --> 1
c    (-b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧ -p_765) -> (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0)
c  in CNF:
c     b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_2
c     b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_1
c     b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨  b^{3, 256}_0
c  in DIMACS:
 7154 -7155  7156  765 -7157 0
 7154 -7155  7156  765 -7158 0
 7154 -7155  7156  765  7159 0

c  1-1 --> 0
c    (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0 ∧ -p_765) -> (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧ -b^{3, 256}_0)
c  in CNF:
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_2
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_1
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_0
c  in DIMACS:
 7154  7155 -7156  765 -7157 0
 7154  7155 -7156  765 -7158 0
 7154  7155 -7156  765 -7159 0

c  0-1 --> -1
c    (-b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧ -p_765) -> ( b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0)
c  in CNF:
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨  b^{3, 256}_2
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_1
c     b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨  b^{3, 256}_0
c  in DIMACS:
 7154  7155  7156  765  7157 0
 7154  7155  7156  765 -7158 0
 7154  7155  7156  765  7159 0

c  -1-1 --> -2
c    ( b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧  b^{3, 255}_0 ∧ -p_765) -> ( b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0)
c  in CNF:
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨  b^{3, 256}_2
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨  b^{3, 256}_1
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨  p_765 ∨ -b^{3, 256}_0
c  in DIMACS:
-7154  7155 -7156  765  7157 0
-7154  7155 -7156  765  7158 0
-7154  7155 -7156  765 -7159 0

c  -2-1 --> break 
c    ( b^{3, 255}_2 ∧  b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨  b^{3, 255}_0 ∨  p_765 ∨ break
c  in DIMACS:
-7154 -7155  7156  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 255}_2 ∧ -b^{3, 255}_1 ∧ -b^{3, 255}_0 ∧ true) 
c  in CNF:
c    -b^{3, 255}_2 ∨  b^{3, 255}_1 ∨  b^{3, 255}_0 ∨ false 
c  in DIMACS:
-7154  7155  7156  0

c  3 does not represent an automaton state.
c    -(-b^{3, 255}_2 ∧  b^{3, 255}_1 ∧  b^{3, 255}_0 ∧ true) 
c  in CNF:
c     b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ false 
c  in DIMACS:
 7154 -7155 -7156  0
c  -3 does not represent an automaton state.
c    -( b^{3, 255}_2 ∧  b^{3, 255}_1 ∧  b^{3, 255}_0 ∧ true) 
c  in CNF:
c    -b^{3, 255}_2 ∨ -b^{3, 255}_1 ∨ -b^{3, 255}_0 ∨ false 
c  in DIMACS:
-7154 -7155 -7156  0

c i = 256
c  -2+1 --> -1
c    ( b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧  p_768) -> ( b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0)
c  in CNF:
c    -b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨  b^{3, 257}_2
c    -b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_1
c    -b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨  b^{3, 257}_0
c  in DIMACS:
-7157 -7158  7159 -768  7160 0
-7157 -7158  7159 -768 -7161 0
-7157 -7158  7159 -768  7162 0

c  -1+1 --> 0
c    ( b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0 ∧  p_768) -> (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧ -b^{3, 257}_0)
c  in CNF:
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_2
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_1
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_0
c  in DIMACS:
-7157  7158 -7159 -768 -7160 0
-7157  7158 -7159 -768 -7161 0
-7157  7158 -7159 -768 -7162 0

c  0+1 --> 1
c    (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧  p_768) -> (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0)
c  in CNF:
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_2
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_1
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨  b^{3, 257}_0
c  in DIMACS:
 7157  7158  7159 -768 -7160 0
 7157  7158  7159 -768 -7161 0
 7157  7158  7159 -768  7162 0

c  1+1 --> 2
c    (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0 ∧  p_768) -> (-b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0)
c  in CNF:
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_2
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨  b^{3, 257}_1
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ -p_768 ∨ -b^{3, 257}_0
c  in DIMACS:
 7157  7158 -7159 -768 -7160 0
 7157  7158 -7159 -768  7161 0
 7157  7158 -7159 -768 -7162 0

c  2+1 --> break 
c    (-b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧  p_768) -> break
c  in CNF:
c     b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 7157 -7158  7159 -768 1162 0


c  2-1 --> 1
c    (-b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧ -p_768) -> (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0)
c  in CNF:
c     b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_2
c     b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_1
c     b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨  b^{3, 257}_0
c  in DIMACS:
 7157 -7158  7159  768 -7160 0
 7157 -7158  7159  768 -7161 0
 7157 -7158  7159  768  7162 0

c  1-1 --> 0
c    (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0 ∧ -p_768) -> (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧ -b^{3, 257}_0)
c  in CNF:
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_2
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_1
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_0
c  in DIMACS:
 7157  7158 -7159  768 -7160 0
 7157  7158 -7159  768 -7161 0
 7157  7158 -7159  768 -7162 0

c  0-1 --> -1
c    (-b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧ -p_768) -> ( b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0)
c  in CNF:
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨  b^{3, 257}_2
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_1
c     b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨  b^{3, 257}_0
c  in DIMACS:
 7157  7158  7159  768  7160 0
 7157  7158  7159  768 -7161 0
 7157  7158  7159  768  7162 0

c  -1-1 --> -2
c    ( b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧  b^{3, 256}_0 ∧ -p_768) -> ( b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0)
c  in CNF:
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨  b^{3, 257}_2
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨  b^{3, 257}_1
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨  p_768 ∨ -b^{3, 257}_0
c  in DIMACS:
-7157  7158 -7159  768  7160 0
-7157  7158 -7159  768  7161 0
-7157  7158 -7159  768 -7162 0

c  -2-1 --> break 
c    ( b^{3, 256}_2 ∧  b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨  b^{3, 256}_0 ∨  p_768 ∨ break
c  in DIMACS:
-7157 -7158  7159  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 256}_2 ∧ -b^{3, 256}_1 ∧ -b^{3, 256}_0 ∧ true) 
c  in CNF:
c    -b^{3, 256}_2 ∨  b^{3, 256}_1 ∨  b^{3, 256}_0 ∨ false 
c  in DIMACS:
-7157  7158  7159  0

c  3 does not represent an automaton state.
c    -(-b^{3, 256}_2 ∧  b^{3, 256}_1 ∧  b^{3, 256}_0 ∧ true) 
c  in CNF:
c     b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ false 
c  in DIMACS:
 7157 -7158 -7159  0
c  -3 does not represent an automaton state.
c    -( b^{3, 256}_2 ∧  b^{3, 256}_1 ∧  b^{3, 256}_0 ∧ true) 
c  in CNF:
c    -b^{3, 256}_2 ∨ -b^{3, 256}_1 ∨ -b^{3, 256}_0 ∨ false 
c  in DIMACS:
-7157 -7158 -7159  0

c i = 257
c  -2+1 --> -1
c    ( b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧  p_771) -> ( b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0)
c  in CNF:
c    -b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨  b^{3, 258}_2
c    -b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_1
c    -b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨  b^{3, 258}_0
c  in DIMACS:
-7160 -7161  7162 -771  7163 0
-7160 -7161  7162 -771 -7164 0
-7160 -7161  7162 -771  7165 0

c  -1+1 --> 0
c    ( b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0 ∧  p_771) -> (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧ -b^{3, 258}_0)
c  in CNF:
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_2
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_1
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_0
c  in DIMACS:
-7160  7161 -7162 -771 -7163 0
-7160  7161 -7162 -771 -7164 0
-7160  7161 -7162 -771 -7165 0

c  0+1 --> 1
c    (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧  p_771) -> (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0)
c  in CNF:
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_2
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_1
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨  b^{3, 258}_0
c  in DIMACS:
 7160  7161  7162 -771 -7163 0
 7160  7161  7162 -771 -7164 0
 7160  7161  7162 -771  7165 0

c  1+1 --> 2
c    (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0 ∧  p_771) -> (-b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0)
c  in CNF:
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_2
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨  b^{3, 258}_1
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ -p_771 ∨ -b^{3, 258}_0
c  in DIMACS:
 7160  7161 -7162 -771 -7163 0
 7160  7161 -7162 -771  7164 0
 7160  7161 -7162 -771 -7165 0

c  2+1 --> break 
c    (-b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧  p_771) -> break
c  in CNF:
c     b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ -p_771 ∨ break
c  in DIMACS:
 7160 -7161  7162 -771 1162 0


c  2-1 --> 1
c    (-b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧ -p_771) -> (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0)
c  in CNF:
c     b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_2
c     b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_1
c     b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨  b^{3, 258}_0
c  in DIMACS:
 7160 -7161  7162  771 -7163 0
 7160 -7161  7162  771 -7164 0
 7160 -7161  7162  771  7165 0

c  1-1 --> 0
c    (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0 ∧ -p_771) -> (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧ -b^{3, 258}_0)
c  in CNF:
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_2
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_1
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_0
c  in DIMACS:
 7160  7161 -7162  771 -7163 0
 7160  7161 -7162  771 -7164 0
 7160  7161 -7162  771 -7165 0

c  0-1 --> -1
c    (-b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧ -p_771) -> ( b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0)
c  in CNF:
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨  b^{3, 258}_2
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_1
c     b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨  b^{3, 258}_0
c  in DIMACS:
 7160  7161  7162  771  7163 0
 7160  7161  7162  771 -7164 0
 7160  7161  7162  771  7165 0

c  -1-1 --> -2
c    ( b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧  b^{3, 257}_0 ∧ -p_771) -> ( b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0)
c  in CNF:
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨  b^{3, 258}_2
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨  b^{3, 258}_1
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨  p_771 ∨ -b^{3, 258}_0
c  in DIMACS:
-7160  7161 -7162  771  7163 0
-7160  7161 -7162  771  7164 0
-7160  7161 -7162  771 -7165 0

c  -2-1 --> break 
c    ( b^{3, 257}_2 ∧  b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧ -p_771) -> break
c  in CNF:
c    -b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨  b^{3, 257}_0 ∨  p_771 ∨ break
c  in DIMACS:
-7160 -7161  7162  771 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 257}_2 ∧ -b^{3, 257}_1 ∧ -b^{3, 257}_0 ∧ true) 
c  in CNF:
c    -b^{3, 257}_2 ∨  b^{3, 257}_1 ∨  b^{3, 257}_0 ∨ false 
c  in DIMACS:
-7160  7161  7162  0

c  3 does not represent an automaton state.
c    -(-b^{3, 257}_2 ∧  b^{3, 257}_1 ∧  b^{3, 257}_0 ∧ true) 
c  in CNF:
c     b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ false 
c  in DIMACS:
 7160 -7161 -7162  0
c  -3 does not represent an automaton state.
c    -( b^{3, 257}_2 ∧  b^{3, 257}_1 ∧  b^{3, 257}_0 ∧ true) 
c  in CNF:
c    -b^{3, 257}_2 ∨ -b^{3, 257}_1 ∨ -b^{3, 257}_0 ∨ false 
c  in DIMACS:
-7160 -7161 -7162  0

c i = 258
c  -2+1 --> -1
c    ( b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧  p_774) -> ( b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0)
c  in CNF:
c    -b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨  b^{3, 259}_2
c    -b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_1
c    -b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨  b^{3, 259}_0
c  in DIMACS:
-7163 -7164  7165 -774  7166 0
-7163 -7164  7165 -774 -7167 0
-7163 -7164  7165 -774  7168 0

c  -1+1 --> 0
c    ( b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0 ∧  p_774) -> (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧ -b^{3, 259}_0)
c  in CNF:
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_2
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_1
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_0
c  in DIMACS:
-7163  7164 -7165 -774 -7166 0
-7163  7164 -7165 -774 -7167 0
-7163  7164 -7165 -774 -7168 0

c  0+1 --> 1
c    (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧  p_774) -> (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0)
c  in CNF:
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_2
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_1
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨  b^{3, 259}_0
c  in DIMACS:
 7163  7164  7165 -774 -7166 0
 7163  7164  7165 -774 -7167 0
 7163  7164  7165 -774  7168 0

c  1+1 --> 2
c    (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0 ∧  p_774) -> (-b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0)
c  in CNF:
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_2
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨  b^{3, 259}_1
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ -p_774 ∨ -b^{3, 259}_0
c  in DIMACS:
 7163  7164 -7165 -774 -7166 0
 7163  7164 -7165 -774  7167 0
 7163  7164 -7165 -774 -7168 0

c  2+1 --> break 
c    (-b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧  p_774) -> break
c  in CNF:
c     b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 7163 -7164  7165 -774 1162 0


c  2-1 --> 1
c    (-b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧ -p_774) -> (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0)
c  in CNF:
c     b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_2
c     b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_1
c     b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨  b^{3, 259}_0
c  in DIMACS:
 7163 -7164  7165  774 -7166 0
 7163 -7164  7165  774 -7167 0
 7163 -7164  7165  774  7168 0

c  1-1 --> 0
c    (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0 ∧ -p_774) -> (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧ -b^{3, 259}_0)
c  in CNF:
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_2
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_1
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_0
c  in DIMACS:
 7163  7164 -7165  774 -7166 0
 7163  7164 -7165  774 -7167 0
 7163  7164 -7165  774 -7168 0

c  0-1 --> -1
c    (-b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧ -p_774) -> ( b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0)
c  in CNF:
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨  b^{3, 259}_2
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_1
c     b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨  b^{3, 259}_0
c  in DIMACS:
 7163  7164  7165  774  7166 0
 7163  7164  7165  774 -7167 0
 7163  7164  7165  774  7168 0

c  -1-1 --> -2
c    ( b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧  b^{3, 258}_0 ∧ -p_774) -> ( b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0)
c  in CNF:
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨  b^{3, 259}_2
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨  b^{3, 259}_1
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨  p_774 ∨ -b^{3, 259}_0
c  in DIMACS:
-7163  7164 -7165  774  7166 0
-7163  7164 -7165  774  7167 0
-7163  7164 -7165  774 -7168 0

c  -2-1 --> break 
c    ( b^{3, 258}_2 ∧  b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨  b^{3, 258}_0 ∨  p_774 ∨ break
c  in DIMACS:
-7163 -7164  7165  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 258}_2 ∧ -b^{3, 258}_1 ∧ -b^{3, 258}_0 ∧ true) 
c  in CNF:
c    -b^{3, 258}_2 ∨  b^{3, 258}_1 ∨  b^{3, 258}_0 ∨ false 
c  in DIMACS:
-7163  7164  7165  0

c  3 does not represent an automaton state.
c    -(-b^{3, 258}_2 ∧  b^{3, 258}_1 ∧  b^{3, 258}_0 ∧ true) 
c  in CNF:
c     b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ false 
c  in DIMACS:
 7163 -7164 -7165  0
c  -3 does not represent an automaton state.
c    -( b^{3, 258}_2 ∧  b^{3, 258}_1 ∧  b^{3, 258}_0 ∧ true) 
c  in CNF:
c    -b^{3, 258}_2 ∨ -b^{3, 258}_1 ∨ -b^{3, 258}_0 ∨ false 
c  in DIMACS:
-7163 -7164 -7165  0

c i = 259
c  -2+1 --> -1
c    ( b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧  p_777) -> ( b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0)
c  in CNF:
c    -b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨  b^{3, 260}_2
c    -b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_1
c    -b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨  b^{3, 260}_0
c  in DIMACS:
-7166 -7167  7168 -777  7169 0
-7166 -7167  7168 -777 -7170 0
-7166 -7167  7168 -777  7171 0

c  -1+1 --> 0
c    ( b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0 ∧  p_777) -> (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧ -b^{3, 260}_0)
c  in CNF:
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_2
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_1
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_0
c  in DIMACS:
-7166  7167 -7168 -777 -7169 0
-7166  7167 -7168 -777 -7170 0
-7166  7167 -7168 -777 -7171 0

c  0+1 --> 1
c    (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧  p_777) -> (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0)
c  in CNF:
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_2
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_1
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨  b^{3, 260}_0
c  in DIMACS:
 7166  7167  7168 -777 -7169 0
 7166  7167  7168 -777 -7170 0
 7166  7167  7168 -777  7171 0

c  1+1 --> 2
c    (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0 ∧  p_777) -> (-b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0)
c  in CNF:
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_2
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨  b^{3, 260}_1
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ -p_777 ∨ -b^{3, 260}_0
c  in DIMACS:
 7166  7167 -7168 -777 -7169 0
 7166  7167 -7168 -777  7170 0
 7166  7167 -7168 -777 -7171 0

c  2+1 --> break 
c    (-b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧  p_777) -> break
c  in CNF:
c     b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 7166 -7167  7168 -777 1162 0


c  2-1 --> 1
c    (-b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧ -p_777) -> (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0)
c  in CNF:
c     b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_2
c     b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_1
c     b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨  b^{3, 260}_0
c  in DIMACS:
 7166 -7167  7168  777 -7169 0
 7166 -7167  7168  777 -7170 0
 7166 -7167  7168  777  7171 0

c  1-1 --> 0
c    (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0 ∧ -p_777) -> (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧ -b^{3, 260}_0)
c  in CNF:
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_2
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_1
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_0
c  in DIMACS:
 7166  7167 -7168  777 -7169 0
 7166  7167 -7168  777 -7170 0
 7166  7167 -7168  777 -7171 0

c  0-1 --> -1
c    (-b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧ -p_777) -> ( b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0)
c  in CNF:
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨  b^{3, 260}_2
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_1
c     b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨  b^{3, 260}_0
c  in DIMACS:
 7166  7167  7168  777  7169 0
 7166  7167  7168  777 -7170 0
 7166  7167  7168  777  7171 0

c  -1-1 --> -2
c    ( b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧  b^{3, 259}_0 ∧ -p_777) -> ( b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0)
c  in CNF:
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨  b^{3, 260}_2
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨  b^{3, 260}_1
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨  p_777 ∨ -b^{3, 260}_0
c  in DIMACS:
-7166  7167 -7168  777  7169 0
-7166  7167 -7168  777  7170 0
-7166  7167 -7168  777 -7171 0

c  -2-1 --> break 
c    ( b^{3, 259}_2 ∧  b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨  b^{3, 259}_0 ∨  p_777 ∨ break
c  in DIMACS:
-7166 -7167  7168  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 259}_2 ∧ -b^{3, 259}_1 ∧ -b^{3, 259}_0 ∧ true) 
c  in CNF:
c    -b^{3, 259}_2 ∨  b^{3, 259}_1 ∨  b^{3, 259}_0 ∨ false 
c  in DIMACS:
-7166  7167  7168  0

c  3 does not represent an automaton state.
c    -(-b^{3, 259}_2 ∧  b^{3, 259}_1 ∧  b^{3, 259}_0 ∧ true) 
c  in CNF:
c     b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ false 
c  in DIMACS:
 7166 -7167 -7168  0
c  -3 does not represent an automaton state.
c    -( b^{3, 259}_2 ∧  b^{3, 259}_1 ∧  b^{3, 259}_0 ∧ true) 
c  in CNF:
c    -b^{3, 259}_2 ∨ -b^{3, 259}_1 ∨ -b^{3, 259}_0 ∨ false 
c  in DIMACS:
-7166 -7167 -7168  0

c i = 260
c  -2+1 --> -1
c    ( b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧  p_780) -> ( b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0)
c  in CNF:
c    -b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨  b^{3, 261}_2
c    -b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_1
c    -b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨  b^{3, 261}_0
c  in DIMACS:
-7169 -7170  7171 -780  7172 0
-7169 -7170  7171 -780 -7173 0
-7169 -7170  7171 -780  7174 0

c  -1+1 --> 0
c    ( b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0 ∧  p_780) -> (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧ -b^{3, 261}_0)
c  in CNF:
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_2
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_1
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_0
c  in DIMACS:
-7169  7170 -7171 -780 -7172 0
-7169  7170 -7171 -780 -7173 0
-7169  7170 -7171 -780 -7174 0

c  0+1 --> 1
c    (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧  p_780) -> (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0)
c  in CNF:
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_2
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_1
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨  b^{3, 261}_0
c  in DIMACS:
 7169  7170  7171 -780 -7172 0
 7169  7170  7171 -780 -7173 0
 7169  7170  7171 -780  7174 0

c  1+1 --> 2
c    (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0 ∧  p_780) -> (-b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0)
c  in CNF:
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_2
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨  b^{3, 261}_1
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ -p_780 ∨ -b^{3, 261}_0
c  in DIMACS:
 7169  7170 -7171 -780 -7172 0
 7169  7170 -7171 -780  7173 0
 7169  7170 -7171 -780 -7174 0

c  2+1 --> break 
c    (-b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧  p_780) -> break
c  in CNF:
c     b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 7169 -7170  7171 -780 1162 0


c  2-1 --> 1
c    (-b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧ -p_780) -> (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0)
c  in CNF:
c     b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_2
c     b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_1
c     b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨  b^{3, 261}_0
c  in DIMACS:
 7169 -7170  7171  780 -7172 0
 7169 -7170  7171  780 -7173 0
 7169 -7170  7171  780  7174 0

c  1-1 --> 0
c    (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0 ∧ -p_780) -> (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧ -b^{3, 261}_0)
c  in CNF:
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_2
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_1
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_0
c  in DIMACS:
 7169  7170 -7171  780 -7172 0
 7169  7170 -7171  780 -7173 0
 7169  7170 -7171  780 -7174 0

c  0-1 --> -1
c    (-b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧ -p_780) -> ( b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0)
c  in CNF:
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨  b^{3, 261}_2
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_1
c     b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨  b^{3, 261}_0
c  in DIMACS:
 7169  7170  7171  780  7172 0
 7169  7170  7171  780 -7173 0
 7169  7170  7171  780  7174 0

c  -1-1 --> -2
c    ( b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧  b^{3, 260}_0 ∧ -p_780) -> ( b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0)
c  in CNF:
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨  b^{3, 261}_2
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨  b^{3, 261}_1
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨  p_780 ∨ -b^{3, 261}_0
c  in DIMACS:
-7169  7170 -7171  780  7172 0
-7169  7170 -7171  780  7173 0
-7169  7170 -7171  780 -7174 0

c  -2-1 --> break 
c    ( b^{3, 260}_2 ∧  b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨  b^{3, 260}_0 ∨  p_780 ∨ break
c  in DIMACS:
-7169 -7170  7171  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 260}_2 ∧ -b^{3, 260}_1 ∧ -b^{3, 260}_0 ∧ true) 
c  in CNF:
c    -b^{3, 260}_2 ∨  b^{3, 260}_1 ∨  b^{3, 260}_0 ∨ false 
c  in DIMACS:
-7169  7170  7171  0

c  3 does not represent an automaton state.
c    -(-b^{3, 260}_2 ∧  b^{3, 260}_1 ∧  b^{3, 260}_0 ∧ true) 
c  in CNF:
c     b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ false 
c  in DIMACS:
 7169 -7170 -7171  0
c  -3 does not represent an automaton state.
c    -( b^{3, 260}_2 ∧  b^{3, 260}_1 ∧  b^{3, 260}_0 ∧ true) 
c  in CNF:
c    -b^{3, 260}_2 ∨ -b^{3, 260}_1 ∨ -b^{3, 260}_0 ∨ false 
c  in DIMACS:
-7169 -7170 -7171  0

c i = 261
c  -2+1 --> -1
c    ( b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧  p_783) -> ( b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0)
c  in CNF:
c    -b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨  b^{3, 262}_2
c    -b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_1
c    -b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨  b^{3, 262}_0
c  in DIMACS:
-7172 -7173  7174 -783  7175 0
-7172 -7173  7174 -783 -7176 0
-7172 -7173  7174 -783  7177 0

c  -1+1 --> 0
c    ( b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0 ∧  p_783) -> (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧ -b^{3, 262}_0)
c  in CNF:
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_2
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_1
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_0
c  in DIMACS:
-7172  7173 -7174 -783 -7175 0
-7172  7173 -7174 -783 -7176 0
-7172  7173 -7174 -783 -7177 0

c  0+1 --> 1
c    (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧  p_783) -> (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0)
c  in CNF:
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_2
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_1
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨  b^{3, 262}_0
c  in DIMACS:
 7172  7173  7174 -783 -7175 0
 7172  7173  7174 -783 -7176 0
 7172  7173  7174 -783  7177 0

c  1+1 --> 2
c    (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0 ∧  p_783) -> (-b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0)
c  in CNF:
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_2
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨  b^{3, 262}_1
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ -p_783 ∨ -b^{3, 262}_0
c  in DIMACS:
 7172  7173 -7174 -783 -7175 0
 7172  7173 -7174 -783  7176 0
 7172  7173 -7174 -783 -7177 0

c  2+1 --> break 
c    (-b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧  p_783) -> break
c  in CNF:
c     b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 7172 -7173  7174 -783 1162 0


c  2-1 --> 1
c    (-b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧ -p_783) -> (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0)
c  in CNF:
c     b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_2
c     b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_1
c     b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨  b^{3, 262}_0
c  in DIMACS:
 7172 -7173  7174  783 -7175 0
 7172 -7173  7174  783 -7176 0
 7172 -7173  7174  783  7177 0

c  1-1 --> 0
c    (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0 ∧ -p_783) -> (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧ -b^{3, 262}_0)
c  in CNF:
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_2
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_1
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_0
c  in DIMACS:
 7172  7173 -7174  783 -7175 0
 7172  7173 -7174  783 -7176 0
 7172  7173 -7174  783 -7177 0

c  0-1 --> -1
c    (-b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧ -p_783) -> ( b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0)
c  in CNF:
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨  b^{3, 262}_2
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_1
c     b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨  b^{3, 262}_0
c  in DIMACS:
 7172  7173  7174  783  7175 0
 7172  7173  7174  783 -7176 0
 7172  7173  7174  783  7177 0

c  -1-1 --> -2
c    ( b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧  b^{3, 261}_0 ∧ -p_783) -> ( b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0)
c  in CNF:
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨  b^{3, 262}_2
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨  b^{3, 262}_1
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨  p_783 ∨ -b^{3, 262}_0
c  in DIMACS:
-7172  7173 -7174  783  7175 0
-7172  7173 -7174  783  7176 0
-7172  7173 -7174  783 -7177 0

c  -2-1 --> break 
c    ( b^{3, 261}_2 ∧  b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨  b^{3, 261}_0 ∨  p_783 ∨ break
c  in DIMACS:
-7172 -7173  7174  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 261}_2 ∧ -b^{3, 261}_1 ∧ -b^{3, 261}_0 ∧ true) 
c  in CNF:
c    -b^{3, 261}_2 ∨  b^{3, 261}_1 ∨  b^{3, 261}_0 ∨ false 
c  in DIMACS:
-7172  7173  7174  0

c  3 does not represent an automaton state.
c    -(-b^{3, 261}_2 ∧  b^{3, 261}_1 ∧  b^{3, 261}_0 ∧ true) 
c  in CNF:
c     b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ false 
c  in DIMACS:
 7172 -7173 -7174  0
c  -3 does not represent an automaton state.
c    -( b^{3, 261}_2 ∧  b^{3, 261}_1 ∧  b^{3, 261}_0 ∧ true) 
c  in CNF:
c    -b^{3, 261}_2 ∨ -b^{3, 261}_1 ∨ -b^{3, 261}_0 ∨ false 
c  in DIMACS:
-7172 -7173 -7174  0

c i = 262
c  -2+1 --> -1
c    ( b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧  p_786) -> ( b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0)
c  in CNF:
c    -b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨  b^{3, 263}_2
c    -b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_1
c    -b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨  b^{3, 263}_0
c  in DIMACS:
-7175 -7176  7177 -786  7178 0
-7175 -7176  7177 -786 -7179 0
-7175 -7176  7177 -786  7180 0

c  -1+1 --> 0
c    ( b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0 ∧  p_786) -> (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧ -b^{3, 263}_0)
c  in CNF:
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_2
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_1
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_0
c  in DIMACS:
-7175  7176 -7177 -786 -7178 0
-7175  7176 -7177 -786 -7179 0
-7175  7176 -7177 -786 -7180 0

c  0+1 --> 1
c    (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧  p_786) -> (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0)
c  in CNF:
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_2
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_1
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨  b^{3, 263}_0
c  in DIMACS:
 7175  7176  7177 -786 -7178 0
 7175  7176  7177 -786 -7179 0
 7175  7176  7177 -786  7180 0

c  1+1 --> 2
c    (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0 ∧  p_786) -> (-b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0)
c  in CNF:
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_2
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨  b^{3, 263}_1
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ -p_786 ∨ -b^{3, 263}_0
c  in DIMACS:
 7175  7176 -7177 -786 -7178 0
 7175  7176 -7177 -786  7179 0
 7175  7176 -7177 -786 -7180 0

c  2+1 --> break 
c    (-b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧  p_786) -> break
c  in CNF:
c     b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 7175 -7176  7177 -786 1162 0


c  2-1 --> 1
c    (-b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧ -p_786) -> (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0)
c  in CNF:
c     b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_2
c     b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_1
c     b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨  b^{3, 263}_0
c  in DIMACS:
 7175 -7176  7177  786 -7178 0
 7175 -7176  7177  786 -7179 0
 7175 -7176  7177  786  7180 0

c  1-1 --> 0
c    (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0 ∧ -p_786) -> (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧ -b^{3, 263}_0)
c  in CNF:
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_2
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_1
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_0
c  in DIMACS:
 7175  7176 -7177  786 -7178 0
 7175  7176 -7177  786 -7179 0
 7175  7176 -7177  786 -7180 0

c  0-1 --> -1
c    (-b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧ -p_786) -> ( b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0)
c  in CNF:
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨  b^{3, 263}_2
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_1
c     b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨  b^{3, 263}_0
c  in DIMACS:
 7175  7176  7177  786  7178 0
 7175  7176  7177  786 -7179 0
 7175  7176  7177  786  7180 0

c  -1-1 --> -2
c    ( b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧  b^{3, 262}_0 ∧ -p_786) -> ( b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0)
c  in CNF:
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨  b^{3, 263}_2
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨  b^{3, 263}_1
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨  p_786 ∨ -b^{3, 263}_0
c  in DIMACS:
-7175  7176 -7177  786  7178 0
-7175  7176 -7177  786  7179 0
-7175  7176 -7177  786 -7180 0

c  -2-1 --> break 
c    ( b^{3, 262}_2 ∧  b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨  b^{3, 262}_0 ∨  p_786 ∨ break
c  in DIMACS:
-7175 -7176  7177  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 262}_2 ∧ -b^{3, 262}_1 ∧ -b^{3, 262}_0 ∧ true) 
c  in CNF:
c    -b^{3, 262}_2 ∨  b^{3, 262}_1 ∨  b^{3, 262}_0 ∨ false 
c  in DIMACS:
-7175  7176  7177  0

c  3 does not represent an automaton state.
c    -(-b^{3, 262}_2 ∧  b^{3, 262}_1 ∧  b^{3, 262}_0 ∧ true) 
c  in CNF:
c     b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ false 
c  in DIMACS:
 7175 -7176 -7177  0
c  -3 does not represent an automaton state.
c    -( b^{3, 262}_2 ∧  b^{3, 262}_1 ∧  b^{3, 262}_0 ∧ true) 
c  in CNF:
c    -b^{3, 262}_2 ∨ -b^{3, 262}_1 ∨ -b^{3, 262}_0 ∨ false 
c  in DIMACS:
-7175 -7176 -7177  0

c i = 263
c  -2+1 --> -1
c    ( b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧  p_789) -> ( b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0)
c  in CNF:
c    -b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨  b^{3, 264}_2
c    -b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_1
c    -b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨  b^{3, 264}_0
c  in DIMACS:
-7178 -7179  7180 -789  7181 0
-7178 -7179  7180 -789 -7182 0
-7178 -7179  7180 -789  7183 0

c  -1+1 --> 0
c    ( b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0 ∧  p_789) -> (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧ -b^{3, 264}_0)
c  in CNF:
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_2
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_1
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_0
c  in DIMACS:
-7178  7179 -7180 -789 -7181 0
-7178  7179 -7180 -789 -7182 0
-7178  7179 -7180 -789 -7183 0

c  0+1 --> 1
c    (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧  p_789) -> (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0)
c  in CNF:
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_2
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_1
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨  b^{3, 264}_0
c  in DIMACS:
 7178  7179  7180 -789 -7181 0
 7178  7179  7180 -789 -7182 0
 7178  7179  7180 -789  7183 0

c  1+1 --> 2
c    (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0 ∧  p_789) -> (-b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0)
c  in CNF:
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_2
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨  b^{3, 264}_1
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ -p_789 ∨ -b^{3, 264}_0
c  in DIMACS:
 7178  7179 -7180 -789 -7181 0
 7178  7179 -7180 -789  7182 0
 7178  7179 -7180 -789 -7183 0

c  2+1 --> break 
c    (-b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧  p_789) -> break
c  in CNF:
c     b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ -p_789 ∨ break
c  in DIMACS:
 7178 -7179  7180 -789 1162 0


c  2-1 --> 1
c    (-b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧ -p_789) -> (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0)
c  in CNF:
c     b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_2
c     b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_1
c     b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨  b^{3, 264}_0
c  in DIMACS:
 7178 -7179  7180  789 -7181 0
 7178 -7179  7180  789 -7182 0
 7178 -7179  7180  789  7183 0

c  1-1 --> 0
c    (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0 ∧ -p_789) -> (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧ -b^{3, 264}_0)
c  in CNF:
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_2
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_1
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_0
c  in DIMACS:
 7178  7179 -7180  789 -7181 0
 7178  7179 -7180  789 -7182 0
 7178  7179 -7180  789 -7183 0

c  0-1 --> -1
c    (-b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧ -p_789) -> ( b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0)
c  in CNF:
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨  b^{3, 264}_2
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_1
c     b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨  b^{3, 264}_0
c  in DIMACS:
 7178  7179  7180  789  7181 0
 7178  7179  7180  789 -7182 0
 7178  7179  7180  789  7183 0

c  -1-1 --> -2
c    ( b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧  b^{3, 263}_0 ∧ -p_789) -> ( b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0)
c  in CNF:
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨  b^{3, 264}_2
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨  b^{3, 264}_1
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨  p_789 ∨ -b^{3, 264}_0
c  in DIMACS:
-7178  7179 -7180  789  7181 0
-7178  7179 -7180  789  7182 0
-7178  7179 -7180  789 -7183 0

c  -2-1 --> break 
c    ( b^{3, 263}_2 ∧  b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧ -p_789) -> break
c  in CNF:
c    -b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨  b^{3, 263}_0 ∨  p_789 ∨ break
c  in DIMACS:
-7178 -7179  7180  789 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 263}_2 ∧ -b^{3, 263}_1 ∧ -b^{3, 263}_0 ∧ true) 
c  in CNF:
c    -b^{3, 263}_2 ∨  b^{3, 263}_1 ∨  b^{3, 263}_0 ∨ false 
c  in DIMACS:
-7178  7179  7180  0

c  3 does not represent an automaton state.
c    -(-b^{3, 263}_2 ∧  b^{3, 263}_1 ∧  b^{3, 263}_0 ∧ true) 
c  in CNF:
c     b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ false 
c  in DIMACS:
 7178 -7179 -7180  0
c  -3 does not represent an automaton state.
c    -( b^{3, 263}_2 ∧  b^{3, 263}_1 ∧  b^{3, 263}_0 ∧ true) 
c  in CNF:
c    -b^{3, 263}_2 ∨ -b^{3, 263}_1 ∨ -b^{3, 263}_0 ∨ false 
c  in DIMACS:
-7178 -7179 -7180  0

c i = 264
c  -2+1 --> -1
c    ( b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧  p_792) -> ( b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0)
c  in CNF:
c    -b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨  b^{3, 265}_2
c    -b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_1
c    -b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨  b^{3, 265}_0
c  in DIMACS:
-7181 -7182  7183 -792  7184 0
-7181 -7182  7183 -792 -7185 0
-7181 -7182  7183 -792  7186 0

c  -1+1 --> 0
c    ( b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0 ∧  p_792) -> (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧ -b^{3, 265}_0)
c  in CNF:
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_2
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_1
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_0
c  in DIMACS:
-7181  7182 -7183 -792 -7184 0
-7181  7182 -7183 -792 -7185 0
-7181  7182 -7183 -792 -7186 0

c  0+1 --> 1
c    (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧  p_792) -> (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0)
c  in CNF:
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_2
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_1
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨  b^{3, 265}_0
c  in DIMACS:
 7181  7182  7183 -792 -7184 0
 7181  7182  7183 -792 -7185 0
 7181  7182  7183 -792  7186 0

c  1+1 --> 2
c    (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0 ∧  p_792) -> (-b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0)
c  in CNF:
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_2
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨  b^{3, 265}_1
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ -p_792 ∨ -b^{3, 265}_0
c  in DIMACS:
 7181  7182 -7183 -792 -7184 0
 7181  7182 -7183 -792  7185 0
 7181  7182 -7183 -792 -7186 0

c  2+1 --> break 
c    (-b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧  p_792) -> break
c  in CNF:
c     b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 7181 -7182  7183 -792 1162 0


c  2-1 --> 1
c    (-b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧ -p_792) -> (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0)
c  in CNF:
c     b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_2
c     b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_1
c     b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨  b^{3, 265}_0
c  in DIMACS:
 7181 -7182  7183  792 -7184 0
 7181 -7182  7183  792 -7185 0
 7181 -7182  7183  792  7186 0

c  1-1 --> 0
c    (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0 ∧ -p_792) -> (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧ -b^{3, 265}_0)
c  in CNF:
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_2
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_1
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_0
c  in DIMACS:
 7181  7182 -7183  792 -7184 0
 7181  7182 -7183  792 -7185 0
 7181  7182 -7183  792 -7186 0

c  0-1 --> -1
c    (-b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧ -p_792) -> ( b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0)
c  in CNF:
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨  b^{3, 265}_2
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_1
c     b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨  b^{3, 265}_0
c  in DIMACS:
 7181  7182  7183  792  7184 0
 7181  7182  7183  792 -7185 0
 7181  7182  7183  792  7186 0

c  -1-1 --> -2
c    ( b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧  b^{3, 264}_0 ∧ -p_792) -> ( b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0)
c  in CNF:
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨  b^{3, 265}_2
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨  b^{3, 265}_1
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨  p_792 ∨ -b^{3, 265}_0
c  in DIMACS:
-7181  7182 -7183  792  7184 0
-7181  7182 -7183  792  7185 0
-7181  7182 -7183  792 -7186 0

c  -2-1 --> break 
c    ( b^{3, 264}_2 ∧  b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨  b^{3, 264}_0 ∨  p_792 ∨ break
c  in DIMACS:
-7181 -7182  7183  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 264}_2 ∧ -b^{3, 264}_1 ∧ -b^{3, 264}_0 ∧ true) 
c  in CNF:
c    -b^{3, 264}_2 ∨  b^{3, 264}_1 ∨  b^{3, 264}_0 ∨ false 
c  in DIMACS:
-7181  7182  7183  0

c  3 does not represent an automaton state.
c    -(-b^{3, 264}_2 ∧  b^{3, 264}_1 ∧  b^{3, 264}_0 ∧ true) 
c  in CNF:
c     b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ false 
c  in DIMACS:
 7181 -7182 -7183  0
c  -3 does not represent an automaton state.
c    -( b^{3, 264}_2 ∧  b^{3, 264}_1 ∧  b^{3, 264}_0 ∧ true) 
c  in CNF:
c    -b^{3, 264}_2 ∨ -b^{3, 264}_1 ∨ -b^{3, 264}_0 ∨ false 
c  in DIMACS:
-7181 -7182 -7183  0

c i = 265
c  -2+1 --> -1
c    ( b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧  p_795) -> ( b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0)
c  in CNF:
c    -b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨  b^{3, 266}_2
c    -b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_1
c    -b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨  b^{3, 266}_0
c  in DIMACS:
-7184 -7185  7186 -795  7187 0
-7184 -7185  7186 -795 -7188 0
-7184 -7185  7186 -795  7189 0

c  -1+1 --> 0
c    ( b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0 ∧  p_795) -> (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧ -b^{3, 266}_0)
c  in CNF:
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_2
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_1
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_0
c  in DIMACS:
-7184  7185 -7186 -795 -7187 0
-7184  7185 -7186 -795 -7188 0
-7184  7185 -7186 -795 -7189 0

c  0+1 --> 1
c    (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧  p_795) -> (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0)
c  in CNF:
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_2
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_1
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨  b^{3, 266}_0
c  in DIMACS:
 7184  7185  7186 -795 -7187 0
 7184  7185  7186 -795 -7188 0
 7184  7185  7186 -795  7189 0

c  1+1 --> 2
c    (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0 ∧  p_795) -> (-b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0)
c  in CNF:
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_2
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨  b^{3, 266}_1
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ -p_795 ∨ -b^{3, 266}_0
c  in DIMACS:
 7184  7185 -7186 -795 -7187 0
 7184  7185 -7186 -795  7188 0
 7184  7185 -7186 -795 -7189 0

c  2+1 --> break 
c    (-b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧  p_795) -> break
c  in CNF:
c     b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 7184 -7185  7186 -795 1162 0


c  2-1 --> 1
c    (-b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧ -p_795) -> (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0)
c  in CNF:
c     b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_2
c     b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_1
c     b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨  b^{3, 266}_0
c  in DIMACS:
 7184 -7185  7186  795 -7187 0
 7184 -7185  7186  795 -7188 0
 7184 -7185  7186  795  7189 0

c  1-1 --> 0
c    (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0 ∧ -p_795) -> (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧ -b^{3, 266}_0)
c  in CNF:
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_2
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_1
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_0
c  in DIMACS:
 7184  7185 -7186  795 -7187 0
 7184  7185 -7186  795 -7188 0
 7184  7185 -7186  795 -7189 0

c  0-1 --> -1
c    (-b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧ -p_795) -> ( b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0)
c  in CNF:
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨  b^{3, 266}_2
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_1
c     b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨  b^{3, 266}_0
c  in DIMACS:
 7184  7185  7186  795  7187 0
 7184  7185  7186  795 -7188 0
 7184  7185  7186  795  7189 0

c  -1-1 --> -2
c    ( b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧  b^{3, 265}_0 ∧ -p_795) -> ( b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0)
c  in CNF:
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨  b^{3, 266}_2
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨  b^{3, 266}_1
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨  p_795 ∨ -b^{3, 266}_0
c  in DIMACS:
-7184  7185 -7186  795  7187 0
-7184  7185 -7186  795  7188 0
-7184  7185 -7186  795 -7189 0

c  -2-1 --> break 
c    ( b^{3, 265}_2 ∧  b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨  b^{3, 265}_0 ∨  p_795 ∨ break
c  in DIMACS:
-7184 -7185  7186  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 265}_2 ∧ -b^{3, 265}_1 ∧ -b^{3, 265}_0 ∧ true) 
c  in CNF:
c    -b^{3, 265}_2 ∨  b^{3, 265}_1 ∨  b^{3, 265}_0 ∨ false 
c  in DIMACS:
-7184  7185  7186  0

c  3 does not represent an automaton state.
c    -(-b^{3, 265}_2 ∧  b^{3, 265}_1 ∧  b^{3, 265}_0 ∧ true) 
c  in CNF:
c     b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ false 
c  in DIMACS:
 7184 -7185 -7186  0
c  -3 does not represent an automaton state.
c    -( b^{3, 265}_2 ∧  b^{3, 265}_1 ∧  b^{3, 265}_0 ∧ true) 
c  in CNF:
c    -b^{3, 265}_2 ∨ -b^{3, 265}_1 ∨ -b^{3, 265}_0 ∨ false 
c  in DIMACS:
-7184 -7185 -7186  0

c i = 266
c  -2+1 --> -1
c    ( b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧  p_798) -> ( b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0)
c  in CNF:
c    -b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨  b^{3, 267}_2
c    -b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_1
c    -b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨  b^{3, 267}_0
c  in DIMACS:
-7187 -7188  7189 -798  7190 0
-7187 -7188  7189 -798 -7191 0
-7187 -7188  7189 -798  7192 0

c  -1+1 --> 0
c    ( b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0 ∧  p_798) -> (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧ -b^{3, 267}_0)
c  in CNF:
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_2
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_1
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_0
c  in DIMACS:
-7187  7188 -7189 -798 -7190 0
-7187  7188 -7189 -798 -7191 0
-7187  7188 -7189 -798 -7192 0

c  0+1 --> 1
c    (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧  p_798) -> (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0)
c  in CNF:
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_2
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_1
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨  b^{3, 267}_0
c  in DIMACS:
 7187  7188  7189 -798 -7190 0
 7187  7188  7189 -798 -7191 0
 7187  7188  7189 -798  7192 0

c  1+1 --> 2
c    (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0 ∧  p_798) -> (-b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0)
c  in CNF:
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_2
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨  b^{3, 267}_1
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ -p_798 ∨ -b^{3, 267}_0
c  in DIMACS:
 7187  7188 -7189 -798 -7190 0
 7187  7188 -7189 -798  7191 0
 7187  7188 -7189 -798 -7192 0

c  2+1 --> break 
c    (-b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧  p_798) -> break
c  in CNF:
c     b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 7187 -7188  7189 -798 1162 0


c  2-1 --> 1
c    (-b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧ -p_798) -> (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0)
c  in CNF:
c     b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_2
c     b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_1
c     b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨  b^{3, 267}_0
c  in DIMACS:
 7187 -7188  7189  798 -7190 0
 7187 -7188  7189  798 -7191 0
 7187 -7188  7189  798  7192 0

c  1-1 --> 0
c    (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0 ∧ -p_798) -> (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧ -b^{3, 267}_0)
c  in CNF:
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_2
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_1
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_0
c  in DIMACS:
 7187  7188 -7189  798 -7190 0
 7187  7188 -7189  798 -7191 0
 7187  7188 -7189  798 -7192 0

c  0-1 --> -1
c    (-b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧ -p_798) -> ( b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0)
c  in CNF:
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨  b^{3, 267}_2
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_1
c     b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨  b^{3, 267}_0
c  in DIMACS:
 7187  7188  7189  798  7190 0
 7187  7188  7189  798 -7191 0
 7187  7188  7189  798  7192 0

c  -1-1 --> -2
c    ( b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧  b^{3, 266}_0 ∧ -p_798) -> ( b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0)
c  in CNF:
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨  b^{3, 267}_2
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨  b^{3, 267}_1
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨  p_798 ∨ -b^{3, 267}_0
c  in DIMACS:
-7187  7188 -7189  798  7190 0
-7187  7188 -7189  798  7191 0
-7187  7188 -7189  798 -7192 0

c  -2-1 --> break 
c    ( b^{3, 266}_2 ∧  b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨  b^{3, 266}_0 ∨  p_798 ∨ break
c  in DIMACS:
-7187 -7188  7189  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 266}_2 ∧ -b^{3, 266}_1 ∧ -b^{3, 266}_0 ∧ true) 
c  in CNF:
c    -b^{3, 266}_2 ∨  b^{3, 266}_1 ∨  b^{3, 266}_0 ∨ false 
c  in DIMACS:
-7187  7188  7189  0

c  3 does not represent an automaton state.
c    -(-b^{3, 266}_2 ∧  b^{3, 266}_1 ∧  b^{3, 266}_0 ∧ true) 
c  in CNF:
c     b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ false 
c  in DIMACS:
 7187 -7188 -7189  0
c  -3 does not represent an automaton state.
c    -( b^{3, 266}_2 ∧  b^{3, 266}_1 ∧  b^{3, 266}_0 ∧ true) 
c  in CNF:
c    -b^{3, 266}_2 ∨ -b^{3, 266}_1 ∨ -b^{3, 266}_0 ∨ false 
c  in DIMACS:
-7187 -7188 -7189  0

c i = 267
c  -2+1 --> -1
c    ( b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧  p_801) -> ( b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0)
c  in CNF:
c    -b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨  b^{3, 268}_2
c    -b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_1
c    -b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨  b^{3, 268}_0
c  in DIMACS:
-7190 -7191  7192 -801  7193 0
-7190 -7191  7192 -801 -7194 0
-7190 -7191  7192 -801  7195 0

c  -1+1 --> 0
c    ( b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0 ∧  p_801) -> (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧ -b^{3, 268}_0)
c  in CNF:
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_2
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_1
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_0
c  in DIMACS:
-7190  7191 -7192 -801 -7193 0
-7190  7191 -7192 -801 -7194 0
-7190  7191 -7192 -801 -7195 0

c  0+1 --> 1
c    (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧  p_801) -> (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0)
c  in CNF:
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_2
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_1
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨  b^{3, 268}_0
c  in DIMACS:
 7190  7191  7192 -801 -7193 0
 7190  7191  7192 -801 -7194 0
 7190  7191  7192 -801  7195 0

c  1+1 --> 2
c    (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0 ∧  p_801) -> (-b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0)
c  in CNF:
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_2
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨  b^{3, 268}_1
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ -p_801 ∨ -b^{3, 268}_0
c  in DIMACS:
 7190  7191 -7192 -801 -7193 0
 7190  7191 -7192 -801  7194 0
 7190  7191 -7192 -801 -7195 0

c  2+1 --> break 
c    (-b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧  p_801) -> break
c  in CNF:
c     b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ -p_801 ∨ break
c  in DIMACS:
 7190 -7191  7192 -801 1162 0


c  2-1 --> 1
c    (-b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧ -p_801) -> (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0)
c  in CNF:
c     b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_2
c     b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_1
c     b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨  b^{3, 268}_0
c  in DIMACS:
 7190 -7191  7192  801 -7193 0
 7190 -7191  7192  801 -7194 0
 7190 -7191  7192  801  7195 0

c  1-1 --> 0
c    (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0 ∧ -p_801) -> (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧ -b^{3, 268}_0)
c  in CNF:
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_2
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_1
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_0
c  in DIMACS:
 7190  7191 -7192  801 -7193 0
 7190  7191 -7192  801 -7194 0
 7190  7191 -7192  801 -7195 0

c  0-1 --> -1
c    (-b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧ -p_801) -> ( b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0)
c  in CNF:
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨  b^{3, 268}_2
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_1
c     b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨  b^{3, 268}_0
c  in DIMACS:
 7190  7191  7192  801  7193 0
 7190  7191  7192  801 -7194 0
 7190  7191  7192  801  7195 0

c  -1-1 --> -2
c    ( b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧  b^{3, 267}_0 ∧ -p_801) -> ( b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0)
c  in CNF:
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨  b^{3, 268}_2
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨  b^{3, 268}_1
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨  p_801 ∨ -b^{3, 268}_0
c  in DIMACS:
-7190  7191 -7192  801  7193 0
-7190  7191 -7192  801  7194 0
-7190  7191 -7192  801 -7195 0

c  -2-1 --> break 
c    ( b^{3, 267}_2 ∧  b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧ -p_801) -> break
c  in CNF:
c    -b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨  b^{3, 267}_0 ∨  p_801 ∨ break
c  in DIMACS:
-7190 -7191  7192  801 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 267}_2 ∧ -b^{3, 267}_1 ∧ -b^{3, 267}_0 ∧ true) 
c  in CNF:
c    -b^{3, 267}_2 ∨  b^{3, 267}_1 ∨  b^{3, 267}_0 ∨ false 
c  in DIMACS:
-7190  7191  7192  0

c  3 does not represent an automaton state.
c    -(-b^{3, 267}_2 ∧  b^{3, 267}_1 ∧  b^{3, 267}_0 ∧ true) 
c  in CNF:
c     b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ false 
c  in DIMACS:
 7190 -7191 -7192  0
c  -3 does not represent an automaton state.
c    -( b^{3, 267}_2 ∧  b^{3, 267}_1 ∧  b^{3, 267}_0 ∧ true) 
c  in CNF:
c    -b^{3, 267}_2 ∨ -b^{3, 267}_1 ∨ -b^{3, 267}_0 ∨ false 
c  in DIMACS:
-7190 -7191 -7192  0

c i = 268
c  -2+1 --> -1
c    ( b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧  p_804) -> ( b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0)
c  in CNF:
c    -b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨  b^{3, 269}_2
c    -b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_1
c    -b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨  b^{3, 269}_0
c  in DIMACS:
-7193 -7194  7195 -804  7196 0
-7193 -7194  7195 -804 -7197 0
-7193 -7194  7195 -804  7198 0

c  -1+1 --> 0
c    ( b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0 ∧  p_804) -> (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧ -b^{3, 269}_0)
c  in CNF:
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_2
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_1
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_0
c  in DIMACS:
-7193  7194 -7195 -804 -7196 0
-7193  7194 -7195 -804 -7197 0
-7193  7194 -7195 -804 -7198 0

c  0+1 --> 1
c    (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧  p_804) -> (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0)
c  in CNF:
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_2
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_1
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨  b^{3, 269}_0
c  in DIMACS:
 7193  7194  7195 -804 -7196 0
 7193  7194  7195 -804 -7197 0
 7193  7194  7195 -804  7198 0

c  1+1 --> 2
c    (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0 ∧  p_804) -> (-b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0)
c  in CNF:
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_2
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨  b^{3, 269}_1
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ -p_804 ∨ -b^{3, 269}_0
c  in DIMACS:
 7193  7194 -7195 -804 -7196 0
 7193  7194 -7195 -804  7197 0
 7193  7194 -7195 -804 -7198 0

c  2+1 --> break 
c    (-b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧  p_804) -> break
c  in CNF:
c     b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 7193 -7194  7195 -804 1162 0


c  2-1 --> 1
c    (-b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧ -p_804) -> (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0)
c  in CNF:
c     b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_2
c     b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_1
c     b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨  b^{3, 269}_0
c  in DIMACS:
 7193 -7194  7195  804 -7196 0
 7193 -7194  7195  804 -7197 0
 7193 -7194  7195  804  7198 0

c  1-1 --> 0
c    (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0 ∧ -p_804) -> (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧ -b^{3, 269}_0)
c  in CNF:
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_2
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_1
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_0
c  in DIMACS:
 7193  7194 -7195  804 -7196 0
 7193  7194 -7195  804 -7197 0
 7193  7194 -7195  804 -7198 0

c  0-1 --> -1
c    (-b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧ -p_804) -> ( b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0)
c  in CNF:
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨  b^{3, 269}_2
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_1
c     b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨  b^{3, 269}_0
c  in DIMACS:
 7193  7194  7195  804  7196 0
 7193  7194  7195  804 -7197 0
 7193  7194  7195  804  7198 0

c  -1-1 --> -2
c    ( b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧  b^{3, 268}_0 ∧ -p_804) -> ( b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0)
c  in CNF:
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨  b^{3, 269}_2
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨  b^{3, 269}_1
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨  p_804 ∨ -b^{3, 269}_0
c  in DIMACS:
-7193  7194 -7195  804  7196 0
-7193  7194 -7195  804  7197 0
-7193  7194 -7195  804 -7198 0

c  -2-1 --> break 
c    ( b^{3, 268}_2 ∧  b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨  b^{3, 268}_0 ∨  p_804 ∨ break
c  in DIMACS:
-7193 -7194  7195  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 268}_2 ∧ -b^{3, 268}_1 ∧ -b^{3, 268}_0 ∧ true) 
c  in CNF:
c    -b^{3, 268}_2 ∨  b^{3, 268}_1 ∨  b^{3, 268}_0 ∨ false 
c  in DIMACS:
-7193  7194  7195  0

c  3 does not represent an automaton state.
c    -(-b^{3, 268}_2 ∧  b^{3, 268}_1 ∧  b^{3, 268}_0 ∧ true) 
c  in CNF:
c     b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ false 
c  in DIMACS:
 7193 -7194 -7195  0
c  -3 does not represent an automaton state.
c    -( b^{3, 268}_2 ∧  b^{3, 268}_1 ∧  b^{3, 268}_0 ∧ true) 
c  in CNF:
c    -b^{3, 268}_2 ∨ -b^{3, 268}_1 ∨ -b^{3, 268}_0 ∨ false 
c  in DIMACS:
-7193 -7194 -7195  0

c i = 269
c  -2+1 --> -1
c    ( b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧  p_807) -> ( b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0)
c  in CNF:
c    -b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨  b^{3, 270}_2
c    -b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_1
c    -b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨  b^{3, 270}_0
c  in DIMACS:
-7196 -7197  7198 -807  7199 0
-7196 -7197  7198 -807 -7200 0
-7196 -7197  7198 -807  7201 0

c  -1+1 --> 0
c    ( b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0 ∧  p_807) -> (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧ -b^{3, 270}_0)
c  in CNF:
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_2
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_1
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_0
c  in DIMACS:
-7196  7197 -7198 -807 -7199 0
-7196  7197 -7198 -807 -7200 0
-7196  7197 -7198 -807 -7201 0

c  0+1 --> 1
c    (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧  p_807) -> (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0)
c  in CNF:
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_2
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_1
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨  b^{3, 270}_0
c  in DIMACS:
 7196  7197  7198 -807 -7199 0
 7196  7197  7198 -807 -7200 0
 7196  7197  7198 -807  7201 0

c  1+1 --> 2
c    (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0 ∧  p_807) -> (-b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0)
c  in CNF:
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_2
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨  b^{3, 270}_1
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ -p_807 ∨ -b^{3, 270}_0
c  in DIMACS:
 7196  7197 -7198 -807 -7199 0
 7196  7197 -7198 -807  7200 0
 7196  7197 -7198 -807 -7201 0

c  2+1 --> break 
c    (-b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧  p_807) -> break
c  in CNF:
c     b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ -p_807 ∨ break
c  in DIMACS:
 7196 -7197  7198 -807 1162 0


c  2-1 --> 1
c    (-b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧ -p_807) -> (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0)
c  in CNF:
c     b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_2
c     b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_1
c     b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨  b^{3, 270}_0
c  in DIMACS:
 7196 -7197  7198  807 -7199 0
 7196 -7197  7198  807 -7200 0
 7196 -7197  7198  807  7201 0

c  1-1 --> 0
c    (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0 ∧ -p_807) -> (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧ -b^{3, 270}_0)
c  in CNF:
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_2
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_1
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_0
c  in DIMACS:
 7196  7197 -7198  807 -7199 0
 7196  7197 -7198  807 -7200 0
 7196  7197 -7198  807 -7201 0

c  0-1 --> -1
c    (-b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧ -p_807) -> ( b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0)
c  in CNF:
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨  b^{3, 270}_2
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_1
c     b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨  b^{3, 270}_0
c  in DIMACS:
 7196  7197  7198  807  7199 0
 7196  7197  7198  807 -7200 0
 7196  7197  7198  807  7201 0

c  -1-1 --> -2
c    ( b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧  b^{3, 269}_0 ∧ -p_807) -> ( b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0)
c  in CNF:
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨  b^{3, 270}_2
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨  b^{3, 270}_1
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨  p_807 ∨ -b^{3, 270}_0
c  in DIMACS:
-7196  7197 -7198  807  7199 0
-7196  7197 -7198  807  7200 0
-7196  7197 -7198  807 -7201 0

c  -2-1 --> break 
c    ( b^{3, 269}_2 ∧  b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧ -p_807) -> break
c  in CNF:
c    -b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨  b^{3, 269}_0 ∨  p_807 ∨ break
c  in DIMACS:
-7196 -7197  7198  807 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 269}_2 ∧ -b^{3, 269}_1 ∧ -b^{3, 269}_0 ∧ true) 
c  in CNF:
c    -b^{3, 269}_2 ∨  b^{3, 269}_1 ∨  b^{3, 269}_0 ∨ false 
c  in DIMACS:
-7196  7197  7198  0

c  3 does not represent an automaton state.
c    -(-b^{3, 269}_2 ∧  b^{3, 269}_1 ∧  b^{3, 269}_0 ∧ true) 
c  in CNF:
c     b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ false 
c  in DIMACS:
 7196 -7197 -7198  0
c  -3 does not represent an automaton state.
c    -( b^{3, 269}_2 ∧  b^{3, 269}_1 ∧  b^{3, 269}_0 ∧ true) 
c  in CNF:
c    -b^{3, 269}_2 ∨ -b^{3, 269}_1 ∨ -b^{3, 269}_0 ∨ false 
c  in DIMACS:
-7196 -7197 -7198  0

c i = 270
c  -2+1 --> -1
c    ( b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧  p_810) -> ( b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0)
c  in CNF:
c    -b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨  b^{3, 271}_2
c    -b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_1
c    -b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨  b^{3, 271}_0
c  in DIMACS:
-7199 -7200  7201 -810  7202 0
-7199 -7200  7201 -810 -7203 0
-7199 -7200  7201 -810  7204 0

c  -1+1 --> 0
c    ( b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0 ∧  p_810) -> (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧ -b^{3, 271}_0)
c  in CNF:
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_2
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_1
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_0
c  in DIMACS:
-7199  7200 -7201 -810 -7202 0
-7199  7200 -7201 -810 -7203 0
-7199  7200 -7201 -810 -7204 0

c  0+1 --> 1
c    (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧  p_810) -> (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0)
c  in CNF:
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_2
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_1
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨  b^{3, 271}_0
c  in DIMACS:
 7199  7200  7201 -810 -7202 0
 7199  7200  7201 -810 -7203 0
 7199  7200  7201 -810  7204 0

c  1+1 --> 2
c    (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0 ∧  p_810) -> (-b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0)
c  in CNF:
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_2
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨  b^{3, 271}_1
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ -p_810 ∨ -b^{3, 271}_0
c  in DIMACS:
 7199  7200 -7201 -810 -7202 0
 7199  7200 -7201 -810  7203 0
 7199  7200 -7201 -810 -7204 0

c  2+1 --> break 
c    (-b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧  p_810) -> break
c  in CNF:
c     b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 7199 -7200  7201 -810 1162 0


c  2-1 --> 1
c    (-b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧ -p_810) -> (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0)
c  in CNF:
c     b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_2
c     b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_1
c     b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨  b^{3, 271}_0
c  in DIMACS:
 7199 -7200  7201  810 -7202 0
 7199 -7200  7201  810 -7203 0
 7199 -7200  7201  810  7204 0

c  1-1 --> 0
c    (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0 ∧ -p_810) -> (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧ -b^{3, 271}_0)
c  in CNF:
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_2
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_1
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_0
c  in DIMACS:
 7199  7200 -7201  810 -7202 0
 7199  7200 -7201  810 -7203 0
 7199  7200 -7201  810 -7204 0

c  0-1 --> -1
c    (-b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧ -p_810) -> ( b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0)
c  in CNF:
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨  b^{3, 271}_2
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_1
c     b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨  b^{3, 271}_0
c  in DIMACS:
 7199  7200  7201  810  7202 0
 7199  7200  7201  810 -7203 0
 7199  7200  7201  810  7204 0

c  -1-1 --> -2
c    ( b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧  b^{3, 270}_0 ∧ -p_810) -> ( b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0)
c  in CNF:
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨  b^{3, 271}_2
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨  b^{3, 271}_1
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨  p_810 ∨ -b^{3, 271}_0
c  in DIMACS:
-7199  7200 -7201  810  7202 0
-7199  7200 -7201  810  7203 0
-7199  7200 -7201  810 -7204 0

c  -2-1 --> break 
c    ( b^{3, 270}_2 ∧  b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨  b^{3, 270}_0 ∨  p_810 ∨ break
c  in DIMACS:
-7199 -7200  7201  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 270}_2 ∧ -b^{3, 270}_1 ∧ -b^{3, 270}_0 ∧ true) 
c  in CNF:
c    -b^{3, 270}_2 ∨  b^{3, 270}_1 ∨  b^{3, 270}_0 ∨ false 
c  in DIMACS:
-7199  7200  7201  0

c  3 does not represent an automaton state.
c    -(-b^{3, 270}_2 ∧  b^{3, 270}_1 ∧  b^{3, 270}_0 ∧ true) 
c  in CNF:
c     b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ false 
c  in DIMACS:
 7199 -7200 -7201  0
c  -3 does not represent an automaton state.
c    -( b^{3, 270}_2 ∧  b^{3, 270}_1 ∧  b^{3, 270}_0 ∧ true) 
c  in CNF:
c    -b^{3, 270}_2 ∨ -b^{3, 270}_1 ∨ -b^{3, 270}_0 ∨ false 
c  in DIMACS:
-7199 -7200 -7201  0

c i = 271
c  -2+1 --> -1
c    ( b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧  p_813) -> ( b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0)
c  in CNF:
c    -b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨  b^{3, 272}_2
c    -b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_1
c    -b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨  b^{3, 272}_0
c  in DIMACS:
-7202 -7203  7204 -813  7205 0
-7202 -7203  7204 -813 -7206 0
-7202 -7203  7204 -813  7207 0

c  -1+1 --> 0
c    ( b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0 ∧  p_813) -> (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧ -b^{3, 272}_0)
c  in CNF:
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_2
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_1
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_0
c  in DIMACS:
-7202  7203 -7204 -813 -7205 0
-7202  7203 -7204 -813 -7206 0
-7202  7203 -7204 -813 -7207 0

c  0+1 --> 1
c    (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧  p_813) -> (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0)
c  in CNF:
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_2
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_1
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨  b^{3, 272}_0
c  in DIMACS:
 7202  7203  7204 -813 -7205 0
 7202  7203  7204 -813 -7206 0
 7202  7203  7204 -813  7207 0

c  1+1 --> 2
c    (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0 ∧  p_813) -> (-b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0)
c  in CNF:
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_2
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨  b^{3, 272}_1
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ -p_813 ∨ -b^{3, 272}_0
c  in DIMACS:
 7202  7203 -7204 -813 -7205 0
 7202  7203 -7204 -813  7206 0
 7202  7203 -7204 -813 -7207 0

c  2+1 --> break 
c    (-b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧  p_813) -> break
c  in CNF:
c     b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ -p_813 ∨ break
c  in DIMACS:
 7202 -7203  7204 -813 1162 0


c  2-1 --> 1
c    (-b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧ -p_813) -> (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0)
c  in CNF:
c     b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_2
c     b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_1
c     b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨  b^{3, 272}_0
c  in DIMACS:
 7202 -7203  7204  813 -7205 0
 7202 -7203  7204  813 -7206 0
 7202 -7203  7204  813  7207 0

c  1-1 --> 0
c    (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0 ∧ -p_813) -> (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧ -b^{3, 272}_0)
c  in CNF:
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_2
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_1
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_0
c  in DIMACS:
 7202  7203 -7204  813 -7205 0
 7202  7203 -7204  813 -7206 0
 7202  7203 -7204  813 -7207 0

c  0-1 --> -1
c    (-b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧ -p_813) -> ( b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0)
c  in CNF:
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨  b^{3, 272}_2
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_1
c     b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨  b^{3, 272}_0
c  in DIMACS:
 7202  7203  7204  813  7205 0
 7202  7203  7204  813 -7206 0
 7202  7203  7204  813  7207 0

c  -1-1 --> -2
c    ( b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧  b^{3, 271}_0 ∧ -p_813) -> ( b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0)
c  in CNF:
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨  b^{3, 272}_2
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨  b^{3, 272}_1
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨  p_813 ∨ -b^{3, 272}_0
c  in DIMACS:
-7202  7203 -7204  813  7205 0
-7202  7203 -7204  813  7206 0
-7202  7203 -7204  813 -7207 0

c  -2-1 --> break 
c    ( b^{3, 271}_2 ∧  b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧ -p_813) -> break
c  in CNF:
c    -b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨  b^{3, 271}_0 ∨  p_813 ∨ break
c  in DIMACS:
-7202 -7203  7204  813 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 271}_2 ∧ -b^{3, 271}_1 ∧ -b^{3, 271}_0 ∧ true) 
c  in CNF:
c    -b^{3, 271}_2 ∨  b^{3, 271}_1 ∨  b^{3, 271}_0 ∨ false 
c  in DIMACS:
-7202  7203  7204  0

c  3 does not represent an automaton state.
c    -(-b^{3, 271}_2 ∧  b^{3, 271}_1 ∧  b^{3, 271}_0 ∧ true) 
c  in CNF:
c     b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ false 
c  in DIMACS:
 7202 -7203 -7204  0
c  -3 does not represent an automaton state.
c    -( b^{3, 271}_2 ∧  b^{3, 271}_1 ∧  b^{3, 271}_0 ∧ true) 
c  in CNF:
c    -b^{3, 271}_2 ∨ -b^{3, 271}_1 ∨ -b^{3, 271}_0 ∨ false 
c  in DIMACS:
-7202 -7203 -7204  0

c i = 272
c  -2+1 --> -1
c    ( b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧  p_816) -> ( b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0)
c  in CNF:
c    -b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨  b^{3, 273}_2
c    -b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_1
c    -b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨  b^{3, 273}_0
c  in DIMACS:
-7205 -7206  7207 -816  7208 0
-7205 -7206  7207 -816 -7209 0
-7205 -7206  7207 -816  7210 0

c  -1+1 --> 0
c    ( b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0 ∧  p_816) -> (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧ -b^{3, 273}_0)
c  in CNF:
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_2
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_1
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_0
c  in DIMACS:
-7205  7206 -7207 -816 -7208 0
-7205  7206 -7207 -816 -7209 0
-7205  7206 -7207 -816 -7210 0

c  0+1 --> 1
c    (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧  p_816) -> (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0)
c  in CNF:
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_2
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_1
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨  b^{3, 273}_0
c  in DIMACS:
 7205  7206  7207 -816 -7208 0
 7205  7206  7207 -816 -7209 0
 7205  7206  7207 -816  7210 0

c  1+1 --> 2
c    (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0 ∧  p_816) -> (-b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0)
c  in CNF:
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_2
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨  b^{3, 273}_1
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ -p_816 ∨ -b^{3, 273}_0
c  in DIMACS:
 7205  7206 -7207 -816 -7208 0
 7205  7206 -7207 -816  7209 0
 7205  7206 -7207 -816 -7210 0

c  2+1 --> break 
c    (-b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧  p_816) -> break
c  in CNF:
c     b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 7205 -7206  7207 -816 1162 0


c  2-1 --> 1
c    (-b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧ -p_816) -> (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0)
c  in CNF:
c     b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_2
c     b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_1
c     b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨  b^{3, 273}_0
c  in DIMACS:
 7205 -7206  7207  816 -7208 0
 7205 -7206  7207  816 -7209 0
 7205 -7206  7207  816  7210 0

c  1-1 --> 0
c    (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0 ∧ -p_816) -> (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧ -b^{3, 273}_0)
c  in CNF:
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_2
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_1
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_0
c  in DIMACS:
 7205  7206 -7207  816 -7208 0
 7205  7206 -7207  816 -7209 0
 7205  7206 -7207  816 -7210 0

c  0-1 --> -1
c    (-b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧ -p_816) -> ( b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0)
c  in CNF:
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨  b^{3, 273}_2
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_1
c     b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨  b^{3, 273}_0
c  in DIMACS:
 7205  7206  7207  816  7208 0
 7205  7206  7207  816 -7209 0
 7205  7206  7207  816  7210 0

c  -1-1 --> -2
c    ( b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧  b^{3, 272}_0 ∧ -p_816) -> ( b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0)
c  in CNF:
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨  b^{3, 273}_2
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨  b^{3, 273}_1
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨  p_816 ∨ -b^{3, 273}_0
c  in DIMACS:
-7205  7206 -7207  816  7208 0
-7205  7206 -7207  816  7209 0
-7205  7206 -7207  816 -7210 0

c  -2-1 --> break 
c    ( b^{3, 272}_2 ∧  b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨  b^{3, 272}_0 ∨  p_816 ∨ break
c  in DIMACS:
-7205 -7206  7207  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 272}_2 ∧ -b^{3, 272}_1 ∧ -b^{3, 272}_0 ∧ true) 
c  in CNF:
c    -b^{3, 272}_2 ∨  b^{3, 272}_1 ∨  b^{3, 272}_0 ∨ false 
c  in DIMACS:
-7205  7206  7207  0

c  3 does not represent an automaton state.
c    -(-b^{3, 272}_2 ∧  b^{3, 272}_1 ∧  b^{3, 272}_0 ∧ true) 
c  in CNF:
c     b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ false 
c  in DIMACS:
 7205 -7206 -7207  0
c  -3 does not represent an automaton state.
c    -( b^{3, 272}_2 ∧  b^{3, 272}_1 ∧  b^{3, 272}_0 ∧ true) 
c  in CNF:
c    -b^{3, 272}_2 ∨ -b^{3, 272}_1 ∨ -b^{3, 272}_0 ∨ false 
c  in DIMACS:
-7205 -7206 -7207  0

c i = 273
c  -2+1 --> -1
c    ( b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧  p_819) -> ( b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0)
c  in CNF:
c    -b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨  b^{3, 274}_2
c    -b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_1
c    -b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨  b^{3, 274}_0
c  in DIMACS:
-7208 -7209  7210 -819  7211 0
-7208 -7209  7210 -819 -7212 0
-7208 -7209  7210 -819  7213 0

c  -1+1 --> 0
c    ( b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0 ∧  p_819) -> (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧ -b^{3, 274}_0)
c  in CNF:
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_2
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_1
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_0
c  in DIMACS:
-7208  7209 -7210 -819 -7211 0
-7208  7209 -7210 -819 -7212 0
-7208  7209 -7210 -819 -7213 0

c  0+1 --> 1
c    (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧  p_819) -> (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0)
c  in CNF:
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_2
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_1
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨  b^{3, 274}_0
c  in DIMACS:
 7208  7209  7210 -819 -7211 0
 7208  7209  7210 -819 -7212 0
 7208  7209  7210 -819  7213 0

c  1+1 --> 2
c    (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0 ∧  p_819) -> (-b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0)
c  in CNF:
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_2
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨  b^{3, 274}_1
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ -p_819 ∨ -b^{3, 274}_0
c  in DIMACS:
 7208  7209 -7210 -819 -7211 0
 7208  7209 -7210 -819  7212 0
 7208  7209 -7210 -819 -7213 0

c  2+1 --> break 
c    (-b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧  p_819) -> break
c  in CNF:
c     b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 7208 -7209  7210 -819 1162 0


c  2-1 --> 1
c    (-b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧ -p_819) -> (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0)
c  in CNF:
c     b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_2
c     b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_1
c     b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨  b^{3, 274}_0
c  in DIMACS:
 7208 -7209  7210  819 -7211 0
 7208 -7209  7210  819 -7212 0
 7208 -7209  7210  819  7213 0

c  1-1 --> 0
c    (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0 ∧ -p_819) -> (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧ -b^{3, 274}_0)
c  in CNF:
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_2
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_1
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_0
c  in DIMACS:
 7208  7209 -7210  819 -7211 0
 7208  7209 -7210  819 -7212 0
 7208  7209 -7210  819 -7213 0

c  0-1 --> -1
c    (-b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧ -p_819) -> ( b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0)
c  in CNF:
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨  b^{3, 274}_2
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_1
c     b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨  b^{3, 274}_0
c  in DIMACS:
 7208  7209  7210  819  7211 0
 7208  7209  7210  819 -7212 0
 7208  7209  7210  819  7213 0

c  -1-1 --> -2
c    ( b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧  b^{3, 273}_0 ∧ -p_819) -> ( b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0)
c  in CNF:
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨  b^{3, 274}_2
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨  b^{3, 274}_1
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨  p_819 ∨ -b^{3, 274}_0
c  in DIMACS:
-7208  7209 -7210  819  7211 0
-7208  7209 -7210  819  7212 0
-7208  7209 -7210  819 -7213 0

c  -2-1 --> break 
c    ( b^{3, 273}_2 ∧  b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨  b^{3, 273}_0 ∨  p_819 ∨ break
c  in DIMACS:
-7208 -7209  7210  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 273}_2 ∧ -b^{3, 273}_1 ∧ -b^{3, 273}_0 ∧ true) 
c  in CNF:
c    -b^{3, 273}_2 ∨  b^{3, 273}_1 ∨  b^{3, 273}_0 ∨ false 
c  in DIMACS:
-7208  7209  7210  0

c  3 does not represent an automaton state.
c    -(-b^{3, 273}_2 ∧  b^{3, 273}_1 ∧  b^{3, 273}_0 ∧ true) 
c  in CNF:
c     b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ false 
c  in DIMACS:
 7208 -7209 -7210  0
c  -3 does not represent an automaton state.
c    -( b^{3, 273}_2 ∧  b^{3, 273}_1 ∧  b^{3, 273}_0 ∧ true) 
c  in CNF:
c    -b^{3, 273}_2 ∨ -b^{3, 273}_1 ∨ -b^{3, 273}_0 ∨ false 
c  in DIMACS:
-7208 -7209 -7210  0

c i = 274
c  -2+1 --> -1
c    ( b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧  p_822) -> ( b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0)
c  in CNF:
c    -b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨  b^{3, 275}_2
c    -b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_1
c    -b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨  b^{3, 275}_0
c  in DIMACS:
-7211 -7212  7213 -822  7214 0
-7211 -7212  7213 -822 -7215 0
-7211 -7212  7213 -822  7216 0

c  -1+1 --> 0
c    ( b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0 ∧  p_822) -> (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧ -b^{3, 275}_0)
c  in CNF:
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_2
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_1
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_0
c  in DIMACS:
-7211  7212 -7213 -822 -7214 0
-7211  7212 -7213 -822 -7215 0
-7211  7212 -7213 -822 -7216 0

c  0+1 --> 1
c    (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧  p_822) -> (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0)
c  in CNF:
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_2
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_1
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨  b^{3, 275}_0
c  in DIMACS:
 7211  7212  7213 -822 -7214 0
 7211  7212  7213 -822 -7215 0
 7211  7212  7213 -822  7216 0

c  1+1 --> 2
c    (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0 ∧  p_822) -> (-b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0)
c  in CNF:
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_2
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨  b^{3, 275}_1
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ -p_822 ∨ -b^{3, 275}_0
c  in DIMACS:
 7211  7212 -7213 -822 -7214 0
 7211  7212 -7213 -822  7215 0
 7211  7212 -7213 -822 -7216 0

c  2+1 --> break 
c    (-b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧  p_822) -> break
c  in CNF:
c     b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 7211 -7212  7213 -822 1162 0


c  2-1 --> 1
c    (-b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧ -p_822) -> (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0)
c  in CNF:
c     b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_2
c     b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_1
c     b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨  b^{3, 275}_0
c  in DIMACS:
 7211 -7212  7213  822 -7214 0
 7211 -7212  7213  822 -7215 0
 7211 -7212  7213  822  7216 0

c  1-1 --> 0
c    (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0 ∧ -p_822) -> (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧ -b^{3, 275}_0)
c  in CNF:
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_2
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_1
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_0
c  in DIMACS:
 7211  7212 -7213  822 -7214 0
 7211  7212 -7213  822 -7215 0
 7211  7212 -7213  822 -7216 0

c  0-1 --> -1
c    (-b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧ -p_822) -> ( b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0)
c  in CNF:
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨  b^{3, 275}_2
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_1
c     b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨  b^{3, 275}_0
c  in DIMACS:
 7211  7212  7213  822  7214 0
 7211  7212  7213  822 -7215 0
 7211  7212  7213  822  7216 0

c  -1-1 --> -2
c    ( b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧  b^{3, 274}_0 ∧ -p_822) -> ( b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0)
c  in CNF:
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨  b^{3, 275}_2
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨  b^{3, 275}_1
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨  p_822 ∨ -b^{3, 275}_0
c  in DIMACS:
-7211  7212 -7213  822  7214 0
-7211  7212 -7213  822  7215 0
-7211  7212 -7213  822 -7216 0

c  -2-1 --> break 
c    ( b^{3, 274}_2 ∧  b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨  b^{3, 274}_0 ∨  p_822 ∨ break
c  in DIMACS:
-7211 -7212  7213  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 274}_2 ∧ -b^{3, 274}_1 ∧ -b^{3, 274}_0 ∧ true) 
c  in CNF:
c    -b^{3, 274}_2 ∨  b^{3, 274}_1 ∨  b^{3, 274}_0 ∨ false 
c  in DIMACS:
-7211  7212  7213  0

c  3 does not represent an automaton state.
c    -(-b^{3, 274}_2 ∧  b^{3, 274}_1 ∧  b^{3, 274}_0 ∧ true) 
c  in CNF:
c     b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ false 
c  in DIMACS:
 7211 -7212 -7213  0
c  -3 does not represent an automaton state.
c    -( b^{3, 274}_2 ∧  b^{3, 274}_1 ∧  b^{3, 274}_0 ∧ true) 
c  in CNF:
c    -b^{3, 274}_2 ∨ -b^{3, 274}_1 ∨ -b^{3, 274}_0 ∨ false 
c  in DIMACS:
-7211 -7212 -7213  0

c i = 275
c  -2+1 --> -1
c    ( b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧  p_825) -> ( b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0)
c  in CNF:
c    -b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨  b^{3, 276}_2
c    -b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_1
c    -b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨  b^{3, 276}_0
c  in DIMACS:
-7214 -7215  7216 -825  7217 0
-7214 -7215  7216 -825 -7218 0
-7214 -7215  7216 -825  7219 0

c  -1+1 --> 0
c    ( b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0 ∧  p_825) -> (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧ -b^{3, 276}_0)
c  in CNF:
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_2
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_1
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_0
c  in DIMACS:
-7214  7215 -7216 -825 -7217 0
-7214  7215 -7216 -825 -7218 0
-7214  7215 -7216 -825 -7219 0

c  0+1 --> 1
c    (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧  p_825) -> (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0)
c  in CNF:
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_2
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_1
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨  b^{3, 276}_0
c  in DIMACS:
 7214  7215  7216 -825 -7217 0
 7214  7215  7216 -825 -7218 0
 7214  7215  7216 -825  7219 0

c  1+1 --> 2
c    (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0 ∧  p_825) -> (-b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0)
c  in CNF:
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_2
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨  b^{3, 276}_1
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ -p_825 ∨ -b^{3, 276}_0
c  in DIMACS:
 7214  7215 -7216 -825 -7217 0
 7214  7215 -7216 -825  7218 0
 7214  7215 -7216 -825 -7219 0

c  2+1 --> break 
c    (-b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧  p_825) -> break
c  in CNF:
c     b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 7214 -7215  7216 -825 1162 0


c  2-1 --> 1
c    (-b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧ -p_825) -> (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0)
c  in CNF:
c     b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_2
c     b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_1
c     b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨  b^{3, 276}_0
c  in DIMACS:
 7214 -7215  7216  825 -7217 0
 7214 -7215  7216  825 -7218 0
 7214 -7215  7216  825  7219 0

c  1-1 --> 0
c    (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0 ∧ -p_825) -> (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧ -b^{3, 276}_0)
c  in CNF:
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_2
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_1
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_0
c  in DIMACS:
 7214  7215 -7216  825 -7217 0
 7214  7215 -7216  825 -7218 0
 7214  7215 -7216  825 -7219 0

c  0-1 --> -1
c    (-b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧ -p_825) -> ( b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0)
c  in CNF:
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨  b^{3, 276}_2
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_1
c     b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨  b^{3, 276}_0
c  in DIMACS:
 7214  7215  7216  825  7217 0
 7214  7215  7216  825 -7218 0
 7214  7215  7216  825  7219 0

c  -1-1 --> -2
c    ( b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧  b^{3, 275}_0 ∧ -p_825) -> ( b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0)
c  in CNF:
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨  b^{3, 276}_2
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨  b^{3, 276}_1
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨  p_825 ∨ -b^{3, 276}_0
c  in DIMACS:
-7214  7215 -7216  825  7217 0
-7214  7215 -7216  825  7218 0
-7214  7215 -7216  825 -7219 0

c  -2-1 --> break 
c    ( b^{3, 275}_2 ∧  b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨  b^{3, 275}_0 ∨  p_825 ∨ break
c  in DIMACS:
-7214 -7215  7216  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 275}_2 ∧ -b^{3, 275}_1 ∧ -b^{3, 275}_0 ∧ true) 
c  in CNF:
c    -b^{3, 275}_2 ∨  b^{3, 275}_1 ∨  b^{3, 275}_0 ∨ false 
c  in DIMACS:
-7214  7215  7216  0

c  3 does not represent an automaton state.
c    -(-b^{3, 275}_2 ∧  b^{3, 275}_1 ∧  b^{3, 275}_0 ∧ true) 
c  in CNF:
c     b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ false 
c  in DIMACS:
 7214 -7215 -7216  0
c  -3 does not represent an automaton state.
c    -( b^{3, 275}_2 ∧  b^{3, 275}_1 ∧  b^{3, 275}_0 ∧ true) 
c  in CNF:
c    -b^{3, 275}_2 ∨ -b^{3, 275}_1 ∨ -b^{3, 275}_0 ∨ false 
c  in DIMACS:
-7214 -7215 -7216  0

c i = 276
c  -2+1 --> -1
c    ( b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧  p_828) -> ( b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0)
c  in CNF:
c    -b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨  b^{3, 277}_2
c    -b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_1
c    -b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨  b^{3, 277}_0
c  in DIMACS:
-7217 -7218  7219 -828  7220 0
-7217 -7218  7219 -828 -7221 0
-7217 -7218  7219 -828  7222 0

c  -1+1 --> 0
c    ( b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0 ∧  p_828) -> (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧ -b^{3, 277}_0)
c  in CNF:
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_2
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_1
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_0
c  in DIMACS:
-7217  7218 -7219 -828 -7220 0
-7217  7218 -7219 -828 -7221 0
-7217  7218 -7219 -828 -7222 0

c  0+1 --> 1
c    (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧  p_828) -> (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0)
c  in CNF:
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_2
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_1
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨  b^{3, 277}_0
c  in DIMACS:
 7217  7218  7219 -828 -7220 0
 7217  7218  7219 -828 -7221 0
 7217  7218  7219 -828  7222 0

c  1+1 --> 2
c    (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0 ∧  p_828) -> (-b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0)
c  in CNF:
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_2
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨  b^{3, 277}_1
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ -p_828 ∨ -b^{3, 277}_0
c  in DIMACS:
 7217  7218 -7219 -828 -7220 0
 7217  7218 -7219 -828  7221 0
 7217  7218 -7219 -828 -7222 0

c  2+1 --> break 
c    (-b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧  p_828) -> break
c  in CNF:
c     b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 7217 -7218  7219 -828 1162 0


c  2-1 --> 1
c    (-b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧ -p_828) -> (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0)
c  in CNF:
c     b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_2
c     b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_1
c     b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨  b^{3, 277}_0
c  in DIMACS:
 7217 -7218  7219  828 -7220 0
 7217 -7218  7219  828 -7221 0
 7217 -7218  7219  828  7222 0

c  1-1 --> 0
c    (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0 ∧ -p_828) -> (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧ -b^{3, 277}_0)
c  in CNF:
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_2
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_1
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_0
c  in DIMACS:
 7217  7218 -7219  828 -7220 0
 7217  7218 -7219  828 -7221 0
 7217  7218 -7219  828 -7222 0

c  0-1 --> -1
c    (-b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧ -p_828) -> ( b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0)
c  in CNF:
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨  b^{3, 277}_2
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_1
c     b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨  b^{3, 277}_0
c  in DIMACS:
 7217  7218  7219  828  7220 0
 7217  7218  7219  828 -7221 0
 7217  7218  7219  828  7222 0

c  -1-1 --> -2
c    ( b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧  b^{3, 276}_0 ∧ -p_828) -> ( b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0)
c  in CNF:
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨  b^{3, 277}_2
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨  b^{3, 277}_1
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨  p_828 ∨ -b^{3, 277}_0
c  in DIMACS:
-7217  7218 -7219  828  7220 0
-7217  7218 -7219  828  7221 0
-7217  7218 -7219  828 -7222 0

c  -2-1 --> break 
c    ( b^{3, 276}_2 ∧  b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨  b^{3, 276}_0 ∨  p_828 ∨ break
c  in DIMACS:
-7217 -7218  7219  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 276}_2 ∧ -b^{3, 276}_1 ∧ -b^{3, 276}_0 ∧ true) 
c  in CNF:
c    -b^{3, 276}_2 ∨  b^{3, 276}_1 ∨  b^{3, 276}_0 ∨ false 
c  in DIMACS:
-7217  7218  7219  0

c  3 does not represent an automaton state.
c    -(-b^{3, 276}_2 ∧  b^{3, 276}_1 ∧  b^{3, 276}_0 ∧ true) 
c  in CNF:
c     b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ false 
c  in DIMACS:
 7217 -7218 -7219  0
c  -3 does not represent an automaton state.
c    -( b^{3, 276}_2 ∧  b^{3, 276}_1 ∧  b^{3, 276}_0 ∧ true) 
c  in CNF:
c    -b^{3, 276}_2 ∨ -b^{3, 276}_1 ∨ -b^{3, 276}_0 ∨ false 
c  in DIMACS:
-7217 -7218 -7219  0

c i = 277
c  -2+1 --> -1
c    ( b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧  p_831) -> ( b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0)
c  in CNF:
c    -b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨  b^{3, 278}_2
c    -b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_1
c    -b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨  b^{3, 278}_0
c  in DIMACS:
-7220 -7221  7222 -831  7223 0
-7220 -7221  7222 -831 -7224 0
-7220 -7221  7222 -831  7225 0

c  -1+1 --> 0
c    ( b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0 ∧  p_831) -> (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧ -b^{3, 278}_0)
c  in CNF:
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_2
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_1
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_0
c  in DIMACS:
-7220  7221 -7222 -831 -7223 0
-7220  7221 -7222 -831 -7224 0
-7220  7221 -7222 -831 -7225 0

c  0+1 --> 1
c    (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧  p_831) -> (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0)
c  in CNF:
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_2
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_1
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨  b^{3, 278}_0
c  in DIMACS:
 7220  7221  7222 -831 -7223 0
 7220  7221  7222 -831 -7224 0
 7220  7221  7222 -831  7225 0

c  1+1 --> 2
c    (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0 ∧  p_831) -> (-b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0)
c  in CNF:
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_2
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨  b^{3, 278}_1
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ -p_831 ∨ -b^{3, 278}_0
c  in DIMACS:
 7220  7221 -7222 -831 -7223 0
 7220  7221 -7222 -831  7224 0
 7220  7221 -7222 -831 -7225 0

c  2+1 --> break 
c    (-b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧  p_831) -> break
c  in CNF:
c     b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ -p_831 ∨ break
c  in DIMACS:
 7220 -7221  7222 -831 1162 0


c  2-1 --> 1
c    (-b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧ -p_831) -> (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0)
c  in CNF:
c     b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_2
c     b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_1
c     b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨  b^{3, 278}_0
c  in DIMACS:
 7220 -7221  7222  831 -7223 0
 7220 -7221  7222  831 -7224 0
 7220 -7221  7222  831  7225 0

c  1-1 --> 0
c    (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0 ∧ -p_831) -> (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧ -b^{3, 278}_0)
c  in CNF:
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_2
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_1
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_0
c  in DIMACS:
 7220  7221 -7222  831 -7223 0
 7220  7221 -7222  831 -7224 0
 7220  7221 -7222  831 -7225 0

c  0-1 --> -1
c    (-b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧ -p_831) -> ( b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0)
c  in CNF:
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨  b^{3, 278}_2
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_1
c     b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨  b^{3, 278}_0
c  in DIMACS:
 7220  7221  7222  831  7223 0
 7220  7221  7222  831 -7224 0
 7220  7221  7222  831  7225 0

c  -1-1 --> -2
c    ( b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧  b^{3, 277}_0 ∧ -p_831) -> ( b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0)
c  in CNF:
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨  b^{3, 278}_2
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨  b^{3, 278}_1
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨  p_831 ∨ -b^{3, 278}_0
c  in DIMACS:
-7220  7221 -7222  831  7223 0
-7220  7221 -7222  831  7224 0
-7220  7221 -7222  831 -7225 0

c  -2-1 --> break 
c    ( b^{3, 277}_2 ∧  b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧ -p_831) -> break
c  in CNF:
c    -b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨  b^{3, 277}_0 ∨  p_831 ∨ break
c  in DIMACS:
-7220 -7221  7222  831 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 277}_2 ∧ -b^{3, 277}_1 ∧ -b^{3, 277}_0 ∧ true) 
c  in CNF:
c    -b^{3, 277}_2 ∨  b^{3, 277}_1 ∨  b^{3, 277}_0 ∨ false 
c  in DIMACS:
-7220  7221  7222  0

c  3 does not represent an automaton state.
c    -(-b^{3, 277}_2 ∧  b^{3, 277}_1 ∧  b^{3, 277}_0 ∧ true) 
c  in CNF:
c     b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ false 
c  in DIMACS:
 7220 -7221 -7222  0
c  -3 does not represent an automaton state.
c    -( b^{3, 277}_2 ∧  b^{3, 277}_1 ∧  b^{3, 277}_0 ∧ true) 
c  in CNF:
c    -b^{3, 277}_2 ∨ -b^{3, 277}_1 ∨ -b^{3, 277}_0 ∨ false 
c  in DIMACS:
-7220 -7221 -7222  0

c i = 278
c  -2+1 --> -1
c    ( b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧  p_834) -> ( b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0)
c  in CNF:
c    -b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨  b^{3, 279}_2
c    -b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_1
c    -b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨  b^{3, 279}_0
c  in DIMACS:
-7223 -7224  7225 -834  7226 0
-7223 -7224  7225 -834 -7227 0
-7223 -7224  7225 -834  7228 0

c  -1+1 --> 0
c    ( b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0 ∧  p_834) -> (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧ -b^{3, 279}_0)
c  in CNF:
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_2
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_1
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_0
c  in DIMACS:
-7223  7224 -7225 -834 -7226 0
-7223  7224 -7225 -834 -7227 0
-7223  7224 -7225 -834 -7228 0

c  0+1 --> 1
c    (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧  p_834) -> (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0)
c  in CNF:
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_2
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_1
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨  b^{3, 279}_0
c  in DIMACS:
 7223  7224  7225 -834 -7226 0
 7223  7224  7225 -834 -7227 0
 7223  7224  7225 -834  7228 0

c  1+1 --> 2
c    (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0 ∧  p_834) -> (-b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0)
c  in CNF:
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_2
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨  b^{3, 279}_1
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ -p_834 ∨ -b^{3, 279}_0
c  in DIMACS:
 7223  7224 -7225 -834 -7226 0
 7223  7224 -7225 -834  7227 0
 7223  7224 -7225 -834 -7228 0

c  2+1 --> break 
c    (-b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧  p_834) -> break
c  in CNF:
c     b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 7223 -7224  7225 -834 1162 0


c  2-1 --> 1
c    (-b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧ -p_834) -> (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0)
c  in CNF:
c     b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_2
c     b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_1
c     b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨  b^{3, 279}_0
c  in DIMACS:
 7223 -7224  7225  834 -7226 0
 7223 -7224  7225  834 -7227 0
 7223 -7224  7225  834  7228 0

c  1-1 --> 0
c    (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0 ∧ -p_834) -> (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧ -b^{3, 279}_0)
c  in CNF:
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_2
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_1
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_0
c  in DIMACS:
 7223  7224 -7225  834 -7226 0
 7223  7224 -7225  834 -7227 0
 7223  7224 -7225  834 -7228 0

c  0-1 --> -1
c    (-b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧ -p_834) -> ( b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0)
c  in CNF:
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨  b^{3, 279}_2
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_1
c     b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨  b^{3, 279}_0
c  in DIMACS:
 7223  7224  7225  834  7226 0
 7223  7224  7225  834 -7227 0
 7223  7224  7225  834  7228 0

c  -1-1 --> -2
c    ( b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧  b^{3, 278}_0 ∧ -p_834) -> ( b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0)
c  in CNF:
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨  b^{3, 279}_2
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨  b^{3, 279}_1
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨  p_834 ∨ -b^{3, 279}_0
c  in DIMACS:
-7223  7224 -7225  834  7226 0
-7223  7224 -7225  834  7227 0
-7223  7224 -7225  834 -7228 0

c  -2-1 --> break 
c    ( b^{3, 278}_2 ∧  b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨  b^{3, 278}_0 ∨  p_834 ∨ break
c  in DIMACS:
-7223 -7224  7225  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 278}_2 ∧ -b^{3, 278}_1 ∧ -b^{3, 278}_0 ∧ true) 
c  in CNF:
c    -b^{3, 278}_2 ∨  b^{3, 278}_1 ∨  b^{3, 278}_0 ∨ false 
c  in DIMACS:
-7223  7224  7225  0

c  3 does not represent an automaton state.
c    -(-b^{3, 278}_2 ∧  b^{3, 278}_1 ∧  b^{3, 278}_0 ∧ true) 
c  in CNF:
c     b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ false 
c  in DIMACS:
 7223 -7224 -7225  0
c  -3 does not represent an automaton state.
c    -( b^{3, 278}_2 ∧  b^{3, 278}_1 ∧  b^{3, 278}_0 ∧ true) 
c  in CNF:
c    -b^{3, 278}_2 ∨ -b^{3, 278}_1 ∨ -b^{3, 278}_0 ∨ false 
c  in DIMACS:
-7223 -7224 -7225  0

c i = 279
c  -2+1 --> -1
c    ( b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧  p_837) -> ( b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0)
c  in CNF:
c    -b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨  b^{3, 280}_2
c    -b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_1
c    -b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨  b^{3, 280}_0
c  in DIMACS:
-7226 -7227  7228 -837  7229 0
-7226 -7227  7228 -837 -7230 0
-7226 -7227  7228 -837  7231 0

c  -1+1 --> 0
c    ( b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0 ∧  p_837) -> (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧ -b^{3, 280}_0)
c  in CNF:
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_2
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_1
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_0
c  in DIMACS:
-7226  7227 -7228 -837 -7229 0
-7226  7227 -7228 -837 -7230 0
-7226  7227 -7228 -837 -7231 0

c  0+1 --> 1
c    (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧  p_837) -> (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0)
c  in CNF:
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_2
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_1
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨  b^{3, 280}_0
c  in DIMACS:
 7226  7227  7228 -837 -7229 0
 7226  7227  7228 -837 -7230 0
 7226  7227  7228 -837  7231 0

c  1+1 --> 2
c    (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0 ∧  p_837) -> (-b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0)
c  in CNF:
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_2
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨  b^{3, 280}_1
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ -p_837 ∨ -b^{3, 280}_0
c  in DIMACS:
 7226  7227 -7228 -837 -7229 0
 7226  7227 -7228 -837  7230 0
 7226  7227 -7228 -837 -7231 0

c  2+1 --> break 
c    (-b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧  p_837) -> break
c  in CNF:
c     b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 7226 -7227  7228 -837 1162 0


c  2-1 --> 1
c    (-b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧ -p_837) -> (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0)
c  in CNF:
c     b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_2
c     b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_1
c     b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨  b^{3, 280}_0
c  in DIMACS:
 7226 -7227  7228  837 -7229 0
 7226 -7227  7228  837 -7230 0
 7226 -7227  7228  837  7231 0

c  1-1 --> 0
c    (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0 ∧ -p_837) -> (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧ -b^{3, 280}_0)
c  in CNF:
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_2
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_1
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_0
c  in DIMACS:
 7226  7227 -7228  837 -7229 0
 7226  7227 -7228  837 -7230 0
 7226  7227 -7228  837 -7231 0

c  0-1 --> -1
c    (-b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧ -p_837) -> ( b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0)
c  in CNF:
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨  b^{3, 280}_2
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_1
c     b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨  b^{3, 280}_0
c  in DIMACS:
 7226  7227  7228  837  7229 0
 7226  7227  7228  837 -7230 0
 7226  7227  7228  837  7231 0

c  -1-1 --> -2
c    ( b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧  b^{3, 279}_0 ∧ -p_837) -> ( b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0)
c  in CNF:
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨  b^{3, 280}_2
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨  b^{3, 280}_1
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨  p_837 ∨ -b^{3, 280}_0
c  in DIMACS:
-7226  7227 -7228  837  7229 0
-7226  7227 -7228  837  7230 0
-7226  7227 -7228  837 -7231 0

c  -2-1 --> break 
c    ( b^{3, 279}_2 ∧  b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨  b^{3, 279}_0 ∨  p_837 ∨ break
c  in DIMACS:
-7226 -7227  7228  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 279}_2 ∧ -b^{3, 279}_1 ∧ -b^{3, 279}_0 ∧ true) 
c  in CNF:
c    -b^{3, 279}_2 ∨  b^{3, 279}_1 ∨  b^{3, 279}_0 ∨ false 
c  in DIMACS:
-7226  7227  7228  0

c  3 does not represent an automaton state.
c    -(-b^{3, 279}_2 ∧  b^{3, 279}_1 ∧  b^{3, 279}_0 ∧ true) 
c  in CNF:
c     b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ false 
c  in DIMACS:
 7226 -7227 -7228  0
c  -3 does not represent an automaton state.
c    -( b^{3, 279}_2 ∧  b^{3, 279}_1 ∧  b^{3, 279}_0 ∧ true) 
c  in CNF:
c    -b^{3, 279}_2 ∨ -b^{3, 279}_1 ∨ -b^{3, 279}_0 ∨ false 
c  in DIMACS:
-7226 -7227 -7228  0

c i = 280
c  -2+1 --> -1
c    ( b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧  p_840) -> ( b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0)
c  in CNF:
c    -b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨  b^{3, 281}_2
c    -b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_1
c    -b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨  b^{3, 281}_0
c  in DIMACS:
-7229 -7230  7231 -840  7232 0
-7229 -7230  7231 -840 -7233 0
-7229 -7230  7231 -840  7234 0

c  -1+1 --> 0
c    ( b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0 ∧  p_840) -> (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧ -b^{3, 281}_0)
c  in CNF:
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_2
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_1
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_0
c  in DIMACS:
-7229  7230 -7231 -840 -7232 0
-7229  7230 -7231 -840 -7233 0
-7229  7230 -7231 -840 -7234 0

c  0+1 --> 1
c    (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧  p_840) -> (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0)
c  in CNF:
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_2
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_1
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨  b^{3, 281}_0
c  in DIMACS:
 7229  7230  7231 -840 -7232 0
 7229  7230  7231 -840 -7233 0
 7229  7230  7231 -840  7234 0

c  1+1 --> 2
c    (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0 ∧  p_840) -> (-b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0)
c  in CNF:
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_2
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨  b^{3, 281}_1
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ -p_840 ∨ -b^{3, 281}_0
c  in DIMACS:
 7229  7230 -7231 -840 -7232 0
 7229  7230 -7231 -840  7233 0
 7229  7230 -7231 -840 -7234 0

c  2+1 --> break 
c    (-b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧  p_840) -> break
c  in CNF:
c     b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 7229 -7230  7231 -840 1162 0


c  2-1 --> 1
c    (-b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧ -p_840) -> (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0)
c  in CNF:
c     b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_2
c     b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_1
c     b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨  b^{3, 281}_0
c  in DIMACS:
 7229 -7230  7231  840 -7232 0
 7229 -7230  7231  840 -7233 0
 7229 -7230  7231  840  7234 0

c  1-1 --> 0
c    (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0 ∧ -p_840) -> (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧ -b^{3, 281}_0)
c  in CNF:
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_2
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_1
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_0
c  in DIMACS:
 7229  7230 -7231  840 -7232 0
 7229  7230 -7231  840 -7233 0
 7229  7230 -7231  840 -7234 0

c  0-1 --> -1
c    (-b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧ -p_840) -> ( b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0)
c  in CNF:
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨  b^{3, 281}_2
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_1
c     b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨  b^{3, 281}_0
c  in DIMACS:
 7229  7230  7231  840  7232 0
 7229  7230  7231  840 -7233 0
 7229  7230  7231  840  7234 0

c  -1-1 --> -2
c    ( b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧  b^{3, 280}_0 ∧ -p_840) -> ( b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0)
c  in CNF:
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨  b^{3, 281}_2
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨  b^{3, 281}_1
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨  p_840 ∨ -b^{3, 281}_0
c  in DIMACS:
-7229  7230 -7231  840  7232 0
-7229  7230 -7231  840  7233 0
-7229  7230 -7231  840 -7234 0

c  -2-1 --> break 
c    ( b^{3, 280}_2 ∧  b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨  b^{3, 280}_0 ∨  p_840 ∨ break
c  in DIMACS:
-7229 -7230  7231  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 280}_2 ∧ -b^{3, 280}_1 ∧ -b^{3, 280}_0 ∧ true) 
c  in CNF:
c    -b^{3, 280}_2 ∨  b^{3, 280}_1 ∨  b^{3, 280}_0 ∨ false 
c  in DIMACS:
-7229  7230  7231  0

c  3 does not represent an automaton state.
c    -(-b^{3, 280}_2 ∧  b^{3, 280}_1 ∧  b^{3, 280}_0 ∧ true) 
c  in CNF:
c     b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ false 
c  in DIMACS:
 7229 -7230 -7231  0
c  -3 does not represent an automaton state.
c    -( b^{3, 280}_2 ∧  b^{3, 280}_1 ∧  b^{3, 280}_0 ∧ true) 
c  in CNF:
c    -b^{3, 280}_2 ∨ -b^{3, 280}_1 ∨ -b^{3, 280}_0 ∨ false 
c  in DIMACS:
-7229 -7230 -7231  0

c i = 281
c  -2+1 --> -1
c    ( b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧  p_843) -> ( b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0)
c  in CNF:
c    -b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨  b^{3, 282}_2
c    -b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_1
c    -b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨  b^{3, 282}_0
c  in DIMACS:
-7232 -7233  7234 -843  7235 0
-7232 -7233  7234 -843 -7236 0
-7232 -7233  7234 -843  7237 0

c  -1+1 --> 0
c    ( b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0 ∧  p_843) -> (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧ -b^{3, 282}_0)
c  in CNF:
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_2
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_1
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_0
c  in DIMACS:
-7232  7233 -7234 -843 -7235 0
-7232  7233 -7234 -843 -7236 0
-7232  7233 -7234 -843 -7237 0

c  0+1 --> 1
c    (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧  p_843) -> (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0)
c  in CNF:
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_2
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_1
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨  b^{3, 282}_0
c  in DIMACS:
 7232  7233  7234 -843 -7235 0
 7232  7233  7234 -843 -7236 0
 7232  7233  7234 -843  7237 0

c  1+1 --> 2
c    (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0 ∧  p_843) -> (-b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0)
c  in CNF:
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_2
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨  b^{3, 282}_1
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ -p_843 ∨ -b^{3, 282}_0
c  in DIMACS:
 7232  7233 -7234 -843 -7235 0
 7232  7233 -7234 -843  7236 0
 7232  7233 -7234 -843 -7237 0

c  2+1 --> break 
c    (-b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧  p_843) -> break
c  in CNF:
c     b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ -p_843 ∨ break
c  in DIMACS:
 7232 -7233  7234 -843 1162 0


c  2-1 --> 1
c    (-b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧ -p_843) -> (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0)
c  in CNF:
c     b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_2
c     b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_1
c     b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨  b^{3, 282}_0
c  in DIMACS:
 7232 -7233  7234  843 -7235 0
 7232 -7233  7234  843 -7236 0
 7232 -7233  7234  843  7237 0

c  1-1 --> 0
c    (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0 ∧ -p_843) -> (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧ -b^{3, 282}_0)
c  in CNF:
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_2
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_1
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_0
c  in DIMACS:
 7232  7233 -7234  843 -7235 0
 7232  7233 -7234  843 -7236 0
 7232  7233 -7234  843 -7237 0

c  0-1 --> -1
c    (-b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧ -p_843) -> ( b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0)
c  in CNF:
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨  b^{3, 282}_2
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_1
c     b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨  b^{3, 282}_0
c  in DIMACS:
 7232  7233  7234  843  7235 0
 7232  7233  7234  843 -7236 0
 7232  7233  7234  843  7237 0

c  -1-1 --> -2
c    ( b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧  b^{3, 281}_0 ∧ -p_843) -> ( b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0)
c  in CNF:
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨  b^{3, 282}_2
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨  b^{3, 282}_1
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨  p_843 ∨ -b^{3, 282}_0
c  in DIMACS:
-7232  7233 -7234  843  7235 0
-7232  7233 -7234  843  7236 0
-7232  7233 -7234  843 -7237 0

c  -2-1 --> break 
c    ( b^{3, 281}_2 ∧  b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧ -p_843) -> break
c  in CNF:
c    -b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨  b^{3, 281}_0 ∨  p_843 ∨ break
c  in DIMACS:
-7232 -7233  7234  843 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 281}_2 ∧ -b^{3, 281}_1 ∧ -b^{3, 281}_0 ∧ true) 
c  in CNF:
c    -b^{3, 281}_2 ∨  b^{3, 281}_1 ∨  b^{3, 281}_0 ∨ false 
c  in DIMACS:
-7232  7233  7234  0

c  3 does not represent an automaton state.
c    -(-b^{3, 281}_2 ∧  b^{3, 281}_1 ∧  b^{3, 281}_0 ∧ true) 
c  in CNF:
c     b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ false 
c  in DIMACS:
 7232 -7233 -7234  0
c  -3 does not represent an automaton state.
c    -( b^{3, 281}_2 ∧  b^{3, 281}_1 ∧  b^{3, 281}_0 ∧ true) 
c  in CNF:
c    -b^{3, 281}_2 ∨ -b^{3, 281}_1 ∨ -b^{3, 281}_0 ∨ false 
c  in DIMACS:
-7232 -7233 -7234  0

c i = 282
c  -2+1 --> -1
c    ( b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧  p_846) -> ( b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0)
c  in CNF:
c    -b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨  b^{3, 283}_2
c    -b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_1
c    -b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨  b^{3, 283}_0
c  in DIMACS:
-7235 -7236  7237 -846  7238 0
-7235 -7236  7237 -846 -7239 0
-7235 -7236  7237 -846  7240 0

c  -1+1 --> 0
c    ( b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0 ∧  p_846) -> (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧ -b^{3, 283}_0)
c  in CNF:
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_2
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_1
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_0
c  in DIMACS:
-7235  7236 -7237 -846 -7238 0
-7235  7236 -7237 -846 -7239 0
-7235  7236 -7237 -846 -7240 0

c  0+1 --> 1
c    (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧  p_846) -> (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0)
c  in CNF:
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_2
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_1
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨  b^{3, 283}_0
c  in DIMACS:
 7235  7236  7237 -846 -7238 0
 7235  7236  7237 -846 -7239 0
 7235  7236  7237 -846  7240 0

c  1+1 --> 2
c    (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0 ∧  p_846) -> (-b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0)
c  in CNF:
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_2
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨  b^{3, 283}_1
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ -p_846 ∨ -b^{3, 283}_0
c  in DIMACS:
 7235  7236 -7237 -846 -7238 0
 7235  7236 -7237 -846  7239 0
 7235  7236 -7237 -846 -7240 0

c  2+1 --> break 
c    (-b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧  p_846) -> break
c  in CNF:
c     b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 7235 -7236  7237 -846 1162 0


c  2-1 --> 1
c    (-b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧ -p_846) -> (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0)
c  in CNF:
c     b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_2
c     b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_1
c     b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨  b^{3, 283}_0
c  in DIMACS:
 7235 -7236  7237  846 -7238 0
 7235 -7236  7237  846 -7239 0
 7235 -7236  7237  846  7240 0

c  1-1 --> 0
c    (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0 ∧ -p_846) -> (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧ -b^{3, 283}_0)
c  in CNF:
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_2
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_1
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_0
c  in DIMACS:
 7235  7236 -7237  846 -7238 0
 7235  7236 -7237  846 -7239 0
 7235  7236 -7237  846 -7240 0

c  0-1 --> -1
c    (-b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧ -p_846) -> ( b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0)
c  in CNF:
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨  b^{3, 283}_2
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_1
c     b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨  b^{3, 283}_0
c  in DIMACS:
 7235  7236  7237  846  7238 0
 7235  7236  7237  846 -7239 0
 7235  7236  7237  846  7240 0

c  -1-1 --> -2
c    ( b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧  b^{3, 282}_0 ∧ -p_846) -> ( b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0)
c  in CNF:
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨  b^{3, 283}_2
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨  b^{3, 283}_1
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨  p_846 ∨ -b^{3, 283}_0
c  in DIMACS:
-7235  7236 -7237  846  7238 0
-7235  7236 -7237  846  7239 0
-7235  7236 -7237  846 -7240 0

c  -2-1 --> break 
c    ( b^{3, 282}_2 ∧  b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨  b^{3, 282}_0 ∨  p_846 ∨ break
c  in DIMACS:
-7235 -7236  7237  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 282}_2 ∧ -b^{3, 282}_1 ∧ -b^{3, 282}_0 ∧ true) 
c  in CNF:
c    -b^{3, 282}_2 ∨  b^{3, 282}_1 ∨  b^{3, 282}_0 ∨ false 
c  in DIMACS:
-7235  7236  7237  0

c  3 does not represent an automaton state.
c    -(-b^{3, 282}_2 ∧  b^{3, 282}_1 ∧  b^{3, 282}_0 ∧ true) 
c  in CNF:
c     b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ false 
c  in DIMACS:
 7235 -7236 -7237  0
c  -3 does not represent an automaton state.
c    -( b^{3, 282}_2 ∧  b^{3, 282}_1 ∧  b^{3, 282}_0 ∧ true) 
c  in CNF:
c    -b^{3, 282}_2 ∨ -b^{3, 282}_1 ∨ -b^{3, 282}_0 ∨ false 
c  in DIMACS:
-7235 -7236 -7237  0

c i = 283
c  -2+1 --> -1
c    ( b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧  p_849) -> ( b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0)
c  in CNF:
c    -b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨  b^{3, 284}_2
c    -b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_1
c    -b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨  b^{3, 284}_0
c  in DIMACS:
-7238 -7239  7240 -849  7241 0
-7238 -7239  7240 -849 -7242 0
-7238 -7239  7240 -849  7243 0

c  -1+1 --> 0
c    ( b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0 ∧  p_849) -> (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧ -b^{3, 284}_0)
c  in CNF:
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_2
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_1
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_0
c  in DIMACS:
-7238  7239 -7240 -849 -7241 0
-7238  7239 -7240 -849 -7242 0
-7238  7239 -7240 -849 -7243 0

c  0+1 --> 1
c    (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧  p_849) -> (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0)
c  in CNF:
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_2
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_1
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨  b^{3, 284}_0
c  in DIMACS:
 7238  7239  7240 -849 -7241 0
 7238  7239  7240 -849 -7242 0
 7238  7239  7240 -849  7243 0

c  1+1 --> 2
c    (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0 ∧  p_849) -> (-b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0)
c  in CNF:
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_2
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨  b^{3, 284}_1
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ -p_849 ∨ -b^{3, 284}_0
c  in DIMACS:
 7238  7239 -7240 -849 -7241 0
 7238  7239 -7240 -849  7242 0
 7238  7239 -7240 -849 -7243 0

c  2+1 --> break 
c    (-b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧  p_849) -> break
c  in CNF:
c     b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ -p_849 ∨ break
c  in DIMACS:
 7238 -7239  7240 -849 1162 0


c  2-1 --> 1
c    (-b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧ -p_849) -> (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0)
c  in CNF:
c     b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_2
c     b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_1
c     b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨  b^{3, 284}_0
c  in DIMACS:
 7238 -7239  7240  849 -7241 0
 7238 -7239  7240  849 -7242 0
 7238 -7239  7240  849  7243 0

c  1-1 --> 0
c    (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0 ∧ -p_849) -> (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧ -b^{3, 284}_0)
c  in CNF:
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_2
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_1
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_0
c  in DIMACS:
 7238  7239 -7240  849 -7241 0
 7238  7239 -7240  849 -7242 0
 7238  7239 -7240  849 -7243 0

c  0-1 --> -1
c    (-b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧ -p_849) -> ( b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0)
c  in CNF:
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨  b^{3, 284}_2
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_1
c     b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨  b^{3, 284}_0
c  in DIMACS:
 7238  7239  7240  849  7241 0
 7238  7239  7240  849 -7242 0
 7238  7239  7240  849  7243 0

c  -1-1 --> -2
c    ( b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧  b^{3, 283}_0 ∧ -p_849) -> ( b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0)
c  in CNF:
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨  b^{3, 284}_2
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨  b^{3, 284}_1
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨  p_849 ∨ -b^{3, 284}_0
c  in DIMACS:
-7238  7239 -7240  849  7241 0
-7238  7239 -7240  849  7242 0
-7238  7239 -7240  849 -7243 0

c  -2-1 --> break 
c    ( b^{3, 283}_2 ∧  b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧ -p_849) -> break
c  in CNF:
c    -b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨  b^{3, 283}_0 ∨  p_849 ∨ break
c  in DIMACS:
-7238 -7239  7240  849 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 283}_2 ∧ -b^{3, 283}_1 ∧ -b^{3, 283}_0 ∧ true) 
c  in CNF:
c    -b^{3, 283}_2 ∨  b^{3, 283}_1 ∨  b^{3, 283}_0 ∨ false 
c  in DIMACS:
-7238  7239  7240  0

c  3 does not represent an automaton state.
c    -(-b^{3, 283}_2 ∧  b^{3, 283}_1 ∧  b^{3, 283}_0 ∧ true) 
c  in CNF:
c     b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ false 
c  in DIMACS:
 7238 -7239 -7240  0
c  -3 does not represent an automaton state.
c    -( b^{3, 283}_2 ∧  b^{3, 283}_1 ∧  b^{3, 283}_0 ∧ true) 
c  in CNF:
c    -b^{3, 283}_2 ∨ -b^{3, 283}_1 ∨ -b^{3, 283}_0 ∨ false 
c  in DIMACS:
-7238 -7239 -7240  0

c i = 284
c  -2+1 --> -1
c    ( b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧  p_852) -> ( b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0)
c  in CNF:
c    -b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨  b^{3, 285}_2
c    -b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_1
c    -b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨  b^{3, 285}_0
c  in DIMACS:
-7241 -7242  7243 -852  7244 0
-7241 -7242  7243 -852 -7245 0
-7241 -7242  7243 -852  7246 0

c  -1+1 --> 0
c    ( b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0 ∧  p_852) -> (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧ -b^{3, 285}_0)
c  in CNF:
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_2
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_1
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_0
c  in DIMACS:
-7241  7242 -7243 -852 -7244 0
-7241  7242 -7243 -852 -7245 0
-7241  7242 -7243 -852 -7246 0

c  0+1 --> 1
c    (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧  p_852) -> (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0)
c  in CNF:
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_2
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_1
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨  b^{3, 285}_0
c  in DIMACS:
 7241  7242  7243 -852 -7244 0
 7241  7242  7243 -852 -7245 0
 7241  7242  7243 -852  7246 0

c  1+1 --> 2
c    (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0 ∧  p_852) -> (-b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0)
c  in CNF:
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_2
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨  b^{3, 285}_1
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ -p_852 ∨ -b^{3, 285}_0
c  in DIMACS:
 7241  7242 -7243 -852 -7244 0
 7241  7242 -7243 -852  7245 0
 7241  7242 -7243 -852 -7246 0

c  2+1 --> break 
c    (-b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧  p_852) -> break
c  in CNF:
c     b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 7241 -7242  7243 -852 1162 0


c  2-1 --> 1
c    (-b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧ -p_852) -> (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0)
c  in CNF:
c     b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_2
c     b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_1
c     b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨  b^{3, 285}_0
c  in DIMACS:
 7241 -7242  7243  852 -7244 0
 7241 -7242  7243  852 -7245 0
 7241 -7242  7243  852  7246 0

c  1-1 --> 0
c    (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0 ∧ -p_852) -> (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧ -b^{3, 285}_0)
c  in CNF:
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_2
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_1
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_0
c  in DIMACS:
 7241  7242 -7243  852 -7244 0
 7241  7242 -7243  852 -7245 0
 7241  7242 -7243  852 -7246 0

c  0-1 --> -1
c    (-b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧ -p_852) -> ( b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0)
c  in CNF:
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨  b^{3, 285}_2
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_1
c     b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨  b^{3, 285}_0
c  in DIMACS:
 7241  7242  7243  852  7244 0
 7241  7242  7243  852 -7245 0
 7241  7242  7243  852  7246 0

c  -1-1 --> -2
c    ( b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧  b^{3, 284}_0 ∧ -p_852) -> ( b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0)
c  in CNF:
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨  b^{3, 285}_2
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨  b^{3, 285}_1
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨  p_852 ∨ -b^{3, 285}_0
c  in DIMACS:
-7241  7242 -7243  852  7244 0
-7241  7242 -7243  852  7245 0
-7241  7242 -7243  852 -7246 0

c  -2-1 --> break 
c    ( b^{3, 284}_2 ∧  b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨  b^{3, 284}_0 ∨  p_852 ∨ break
c  in DIMACS:
-7241 -7242  7243  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 284}_2 ∧ -b^{3, 284}_1 ∧ -b^{3, 284}_0 ∧ true) 
c  in CNF:
c    -b^{3, 284}_2 ∨  b^{3, 284}_1 ∨  b^{3, 284}_0 ∨ false 
c  in DIMACS:
-7241  7242  7243  0

c  3 does not represent an automaton state.
c    -(-b^{3, 284}_2 ∧  b^{3, 284}_1 ∧  b^{3, 284}_0 ∧ true) 
c  in CNF:
c     b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ false 
c  in DIMACS:
 7241 -7242 -7243  0
c  -3 does not represent an automaton state.
c    -( b^{3, 284}_2 ∧  b^{3, 284}_1 ∧  b^{3, 284}_0 ∧ true) 
c  in CNF:
c    -b^{3, 284}_2 ∨ -b^{3, 284}_1 ∨ -b^{3, 284}_0 ∨ false 
c  in DIMACS:
-7241 -7242 -7243  0

c i = 285
c  -2+1 --> -1
c    ( b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧  p_855) -> ( b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0)
c  in CNF:
c    -b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨  b^{3, 286}_2
c    -b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_1
c    -b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨  b^{3, 286}_0
c  in DIMACS:
-7244 -7245  7246 -855  7247 0
-7244 -7245  7246 -855 -7248 0
-7244 -7245  7246 -855  7249 0

c  -1+1 --> 0
c    ( b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0 ∧  p_855) -> (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧ -b^{3, 286}_0)
c  in CNF:
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_2
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_1
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_0
c  in DIMACS:
-7244  7245 -7246 -855 -7247 0
-7244  7245 -7246 -855 -7248 0
-7244  7245 -7246 -855 -7249 0

c  0+1 --> 1
c    (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧  p_855) -> (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0)
c  in CNF:
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_2
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_1
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨  b^{3, 286}_0
c  in DIMACS:
 7244  7245  7246 -855 -7247 0
 7244  7245  7246 -855 -7248 0
 7244  7245  7246 -855  7249 0

c  1+1 --> 2
c    (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0 ∧  p_855) -> (-b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0)
c  in CNF:
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_2
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨  b^{3, 286}_1
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ -p_855 ∨ -b^{3, 286}_0
c  in DIMACS:
 7244  7245 -7246 -855 -7247 0
 7244  7245 -7246 -855  7248 0
 7244  7245 -7246 -855 -7249 0

c  2+1 --> break 
c    (-b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧  p_855) -> break
c  in CNF:
c     b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 7244 -7245  7246 -855 1162 0


c  2-1 --> 1
c    (-b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧ -p_855) -> (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0)
c  in CNF:
c     b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_2
c     b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_1
c     b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨  b^{3, 286}_0
c  in DIMACS:
 7244 -7245  7246  855 -7247 0
 7244 -7245  7246  855 -7248 0
 7244 -7245  7246  855  7249 0

c  1-1 --> 0
c    (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0 ∧ -p_855) -> (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧ -b^{3, 286}_0)
c  in CNF:
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_2
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_1
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_0
c  in DIMACS:
 7244  7245 -7246  855 -7247 0
 7244  7245 -7246  855 -7248 0
 7244  7245 -7246  855 -7249 0

c  0-1 --> -1
c    (-b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧ -p_855) -> ( b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0)
c  in CNF:
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨  b^{3, 286}_2
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_1
c     b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨  b^{3, 286}_0
c  in DIMACS:
 7244  7245  7246  855  7247 0
 7244  7245  7246  855 -7248 0
 7244  7245  7246  855  7249 0

c  -1-1 --> -2
c    ( b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧  b^{3, 285}_0 ∧ -p_855) -> ( b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0)
c  in CNF:
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨  b^{3, 286}_2
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨  b^{3, 286}_1
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨  p_855 ∨ -b^{3, 286}_0
c  in DIMACS:
-7244  7245 -7246  855  7247 0
-7244  7245 -7246  855  7248 0
-7244  7245 -7246  855 -7249 0

c  -2-1 --> break 
c    ( b^{3, 285}_2 ∧  b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨  b^{3, 285}_0 ∨  p_855 ∨ break
c  in DIMACS:
-7244 -7245  7246  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 285}_2 ∧ -b^{3, 285}_1 ∧ -b^{3, 285}_0 ∧ true) 
c  in CNF:
c    -b^{3, 285}_2 ∨  b^{3, 285}_1 ∨  b^{3, 285}_0 ∨ false 
c  in DIMACS:
-7244  7245  7246  0

c  3 does not represent an automaton state.
c    -(-b^{3, 285}_2 ∧  b^{3, 285}_1 ∧  b^{3, 285}_0 ∧ true) 
c  in CNF:
c     b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ false 
c  in DIMACS:
 7244 -7245 -7246  0
c  -3 does not represent an automaton state.
c    -( b^{3, 285}_2 ∧  b^{3, 285}_1 ∧  b^{3, 285}_0 ∧ true) 
c  in CNF:
c    -b^{3, 285}_2 ∨ -b^{3, 285}_1 ∨ -b^{3, 285}_0 ∨ false 
c  in DIMACS:
-7244 -7245 -7246  0

c i = 286
c  -2+1 --> -1
c    ( b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧  p_858) -> ( b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0)
c  in CNF:
c    -b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨  b^{3, 287}_2
c    -b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_1
c    -b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨  b^{3, 287}_0
c  in DIMACS:
-7247 -7248  7249 -858  7250 0
-7247 -7248  7249 -858 -7251 0
-7247 -7248  7249 -858  7252 0

c  -1+1 --> 0
c    ( b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0 ∧  p_858) -> (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧ -b^{3, 287}_0)
c  in CNF:
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_2
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_1
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_0
c  in DIMACS:
-7247  7248 -7249 -858 -7250 0
-7247  7248 -7249 -858 -7251 0
-7247  7248 -7249 -858 -7252 0

c  0+1 --> 1
c    (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧  p_858) -> (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0)
c  in CNF:
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_2
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_1
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨  b^{3, 287}_0
c  in DIMACS:
 7247  7248  7249 -858 -7250 0
 7247  7248  7249 -858 -7251 0
 7247  7248  7249 -858  7252 0

c  1+1 --> 2
c    (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0 ∧  p_858) -> (-b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0)
c  in CNF:
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_2
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨  b^{3, 287}_1
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ -p_858 ∨ -b^{3, 287}_0
c  in DIMACS:
 7247  7248 -7249 -858 -7250 0
 7247  7248 -7249 -858  7251 0
 7247  7248 -7249 -858 -7252 0

c  2+1 --> break 
c    (-b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧  p_858) -> break
c  in CNF:
c     b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 7247 -7248  7249 -858 1162 0


c  2-1 --> 1
c    (-b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧ -p_858) -> (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0)
c  in CNF:
c     b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_2
c     b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_1
c     b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨  b^{3, 287}_0
c  in DIMACS:
 7247 -7248  7249  858 -7250 0
 7247 -7248  7249  858 -7251 0
 7247 -7248  7249  858  7252 0

c  1-1 --> 0
c    (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0 ∧ -p_858) -> (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧ -b^{3, 287}_0)
c  in CNF:
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_2
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_1
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_0
c  in DIMACS:
 7247  7248 -7249  858 -7250 0
 7247  7248 -7249  858 -7251 0
 7247  7248 -7249  858 -7252 0

c  0-1 --> -1
c    (-b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧ -p_858) -> ( b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0)
c  in CNF:
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨  b^{3, 287}_2
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_1
c     b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨  b^{3, 287}_0
c  in DIMACS:
 7247  7248  7249  858  7250 0
 7247  7248  7249  858 -7251 0
 7247  7248  7249  858  7252 0

c  -1-1 --> -2
c    ( b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧  b^{3, 286}_0 ∧ -p_858) -> ( b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0)
c  in CNF:
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨  b^{3, 287}_2
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨  b^{3, 287}_1
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨  p_858 ∨ -b^{3, 287}_0
c  in DIMACS:
-7247  7248 -7249  858  7250 0
-7247  7248 -7249  858  7251 0
-7247  7248 -7249  858 -7252 0

c  -2-1 --> break 
c    ( b^{3, 286}_2 ∧  b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨  b^{3, 286}_0 ∨  p_858 ∨ break
c  in DIMACS:
-7247 -7248  7249  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 286}_2 ∧ -b^{3, 286}_1 ∧ -b^{3, 286}_0 ∧ true) 
c  in CNF:
c    -b^{3, 286}_2 ∨  b^{3, 286}_1 ∨  b^{3, 286}_0 ∨ false 
c  in DIMACS:
-7247  7248  7249  0

c  3 does not represent an automaton state.
c    -(-b^{3, 286}_2 ∧  b^{3, 286}_1 ∧  b^{3, 286}_0 ∧ true) 
c  in CNF:
c     b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ false 
c  in DIMACS:
 7247 -7248 -7249  0
c  -3 does not represent an automaton state.
c    -( b^{3, 286}_2 ∧  b^{3, 286}_1 ∧  b^{3, 286}_0 ∧ true) 
c  in CNF:
c    -b^{3, 286}_2 ∨ -b^{3, 286}_1 ∨ -b^{3, 286}_0 ∨ false 
c  in DIMACS:
-7247 -7248 -7249  0

c i = 287
c  -2+1 --> -1
c    ( b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧  p_861) -> ( b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0)
c  in CNF:
c    -b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨  b^{3, 288}_2
c    -b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_1
c    -b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨  b^{3, 288}_0
c  in DIMACS:
-7250 -7251  7252 -861  7253 0
-7250 -7251  7252 -861 -7254 0
-7250 -7251  7252 -861  7255 0

c  -1+1 --> 0
c    ( b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0 ∧  p_861) -> (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧ -b^{3, 288}_0)
c  in CNF:
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_2
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_1
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_0
c  in DIMACS:
-7250  7251 -7252 -861 -7253 0
-7250  7251 -7252 -861 -7254 0
-7250  7251 -7252 -861 -7255 0

c  0+1 --> 1
c    (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧  p_861) -> (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0)
c  in CNF:
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_2
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_1
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨  b^{3, 288}_0
c  in DIMACS:
 7250  7251  7252 -861 -7253 0
 7250  7251  7252 -861 -7254 0
 7250  7251  7252 -861  7255 0

c  1+1 --> 2
c    (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0 ∧  p_861) -> (-b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0)
c  in CNF:
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_2
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨  b^{3, 288}_1
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ -p_861 ∨ -b^{3, 288}_0
c  in DIMACS:
 7250  7251 -7252 -861 -7253 0
 7250  7251 -7252 -861  7254 0
 7250  7251 -7252 -861 -7255 0

c  2+1 --> break 
c    (-b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧  p_861) -> break
c  in CNF:
c     b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 7250 -7251  7252 -861 1162 0


c  2-1 --> 1
c    (-b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧ -p_861) -> (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0)
c  in CNF:
c     b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_2
c     b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_1
c     b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨  b^{3, 288}_0
c  in DIMACS:
 7250 -7251  7252  861 -7253 0
 7250 -7251  7252  861 -7254 0
 7250 -7251  7252  861  7255 0

c  1-1 --> 0
c    (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0 ∧ -p_861) -> (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧ -b^{3, 288}_0)
c  in CNF:
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_2
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_1
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_0
c  in DIMACS:
 7250  7251 -7252  861 -7253 0
 7250  7251 -7252  861 -7254 0
 7250  7251 -7252  861 -7255 0

c  0-1 --> -1
c    (-b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧ -p_861) -> ( b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0)
c  in CNF:
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨  b^{3, 288}_2
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_1
c     b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨  b^{3, 288}_0
c  in DIMACS:
 7250  7251  7252  861  7253 0
 7250  7251  7252  861 -7254 0
 7250  7251  7252  861  7255 0

c  -1-1 --> -2
c    ( b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧  b^{3, 287}_0 ∧ -p_861) -> ( b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0)
c  in CNF:
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨  b^{3, 288}_2
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨  b^{3, 288}_1
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨  p_861 ∨ -b^{3, 288}_0
c  in DIMACS:
-7250  7251 -7252  861  7253 0
-7250  7251 -7252  861  7254 0
-7250  7251 -7252  861 -7255 0

c  -2-1 --> break 
c    ( b^{3, 287}_2 ∧  b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨  b^{3, 287}_0 ∨  p_861 ∨ break
c  in DIMACS:
-7250 -7251  7252  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 287}_2 ∧ -b^{3, 287}_1 ∧ -b^{3, 287}_0 ∧ true) 
c  in CNF:
c    -b^{3, 287}_2 ∨  b^{3, 287}_1 ∨  b^{3, 287}_0 ∨ false 
c  in DIMACS:
-7250  7251  7252  0

c  3 does not represent an automaton state.
c    -(-b^{3, 287}_2 ∧  b^{3, 287}_1 ∧  b^{3, 287}_0 ∧ true) 
c  in CNF:
c     b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ false 
c  in DIMACS:
 7250 -7251 -7252  0
c  -3 does not represent an automaton state.
c    -( b^{3, 287}_2 ∧  b^{3, 287}_1 ∧  b^{3, 287}_0 ∧ true) 
c  in CNF:
c    -b^{3, 287}_2 ∨ -b^{3, 287}_1 ∨ -b^{3, 287}_0 ∨ false 
c  in DIMACS:
-7250 -7251 -7252  0

c i = 288
c  -2+1 --> -1
c    ( b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧  p_864) -> ( b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0)
c  in CNF:
c    -b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨  b^{3, 289}_2
c    -b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_1
c    -b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨  b^{3, 289}_0
c  in DIMACS:
-7253 -7254  7255 -864  7256 0
-7253 -7254  7255 -864 -7257 0
-7253 -7254  7255 -864  7258 0

c  -1+1 --> 0
c    ( b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0 ∧  p_864) -> (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧ -b^{3, 289}_0)
c  in CNF:
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_2
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_1
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_0
c  in DIMACS:
-7253  7254 -7255 -864 -7256 0
-7253  7254 -7255 -864 -7257 0
-7253  7254 -7255 -864 -7258 0

c  0+1 --> 1
c    (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧  p_864) -> (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0)
c  in CNF:
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_2
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_1
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨  b^{3, 289}_0
c  in DIMACS:
 7253  7254  7255 -864 -7256 0
 7253  7254  7255 -864 -7257 0
 7253  7254  7255 -864  7258 0

c  1+1 --> 2
c    (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0 ∧  p_864) -> (-b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0)
c  in CNF:
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_2
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨  b^{3, 289}_1
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ -p_864 ∨ -b^{3, 289}_0
c  in DIMACS:
 7253  7254 -7255 -864 -7256 0
 7253  7254 -7255 -864  7257 0
 7253  7254 -7255 -864 -7258 0

c  2+1 --> break 
c    (-b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧  p_864) -> break
c  in CNF:
c     b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 7253 -7254  7255 -864 1162 0


c  2-1 --> 1
c    (-b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧ -p_864) -> (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0)
c  in CNF:
c     b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_2
c     b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_1
c     b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨  b^{3, 289}_0
c  in DIMACS:
 7253 -7254  7255  864 -7256 0
 7253 -7254  7255  864 -7257 0
 7253 -7254  7255  864  7258 0

c  1-1 --> 0
c    (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0 ∧ -p_864) -> (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧ -b^{3, 289}_0)
c  in CNF:
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_2
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_1
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_0
c  in DIMACS:
 7253  7254 -7255  864 -7256 0
 7253  7254 -7255  864 -7257 0
 7253  7254 -7255  864 -7258 0

c  0-1 --> -1
c    (-b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧ -p_864) -> ( b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0)
c  in CNF:
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨  b^{3, 289}_2
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_1
c     b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨  b^{3, 289}_0
c  in DIMACS:
 7253  7254  7255  864  7256 0
 7253  7254  7255  864 -7257 0
 7253  7254  7255  864  7258 0

c  -1-1 --> -2
c    ( b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧  b^{3, 288}_0 ∧ -p_864) -> ( b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0)
c  in CNF:
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨  b^{3, 289}_2
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨  b^{3, 289}_1
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨  p_864 ∨ -b^{3, 289}_0
c  in DIMACS:
-7253  7254 -7255  864  7256 0
-7253  7254 -7255  864  7257 0
-7253  7254 -7255  864 -7258 0

c  -2-1 --> break 
c    ( b^{3, 288}_2 ∧  b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨  b^{3, 288}_0 ∨  p_864 ∨ break
c  in DIMACS:
-7253 -7254  7255  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 288}_2 ∧ -b^{3, 288}_1 ∧ -b^{3, 288}_0 ∧ true) 
c  in CNF:
c    -b^{3, 288}_2 ∨  b^{3, 288}_1 ∨  b^{3, 288}_0 ∨ false 
c  in DIMACS:
-7253  7254  7255  0

c  3 does not represent an automaton state.
c    -(-b^{3, 288}_2 ∧  b^{3, 288}_1 ∧  b^{3, 288}_0 ∧ true) 
c  in CNF:
c     b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ false 
c  in DIMACS:
 7253 -7254 -7255  0
c  -3 does not represent an automaton state.
c    -( b^{3, 288}_2 ∧  b^{3, 288}_1 ∧  b^{3, 288}_0 ∧ true) 
c  in CNF:
c    -b^{3, 288}_2 ∨ -b^{3, 288}_1 ∨ -b^{3, 288}_0 ∨ false 
c  in DIMACS:
-7253 -7254 -7255  0

c i = 289
c  -2+1 --> -1
c    ( b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧  p_867) -> ( b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0)
c  in CNF:
c    -b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨  b^{3, 290}_2
c    -b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_1
c    -b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨  b^{3, 290}_0
c  in DIMACS:
-7256 -7257  7258 -867  7259 0
-7256 -7257  7258 -867 -7260 0
-7256 -7257  7258 -867  7261 0

c  -1+1 --> 0
c    ( b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0 ∧  p_867) -> (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧ -b^{3, 290}_0)
c  in CNF:
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_2
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_1
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_0
c  in DIMACS:
-7256  7257 -7258 -867 -7259 0
-7256  7257 -7258 -867 -7260 0
-7256  7257 -7258 -867 -7261 0

c  0+1 --> 1
c    (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧  p_867) -> (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0)
c  in CNF:
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_2
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_1
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨  b^{3, 290}_0
c  in DIMACS:
 7256  7257  7258 -867 -7259 0
 7256  7257  7258 -867 -7260 0
 7256  7257  7258 -867  7261 0

c  1+1 --> 2
c    (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0 ∧  p_867) -> (-b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0)
c  in CNF:
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_2
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨  b^{3, 290}_1
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ -p_867 ∨ -b^{3, 290}_0
c  in DIMACS:
 7256  7257 -7258 -867 -7259 0
 7256  7257 -7258 -867  7260 0
 7256  7257 -7258 -867 -7261 0

c  2+1 --> break 
c    (-b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧  p_867) -> break
c  in CNF:
c     b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ -p_867 ∨ break
c  in DIMACS:
 7256 -7257  7258 -867 1162 0


c  2-1 --> 1
c    (-b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧ -p_867) -> (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0)
c  in CNF:
c     b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_2
c     b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_1
c     b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨  b^{3, 290}_0
c  in DIMACS:
 7256 -7257  7258  867 -7259 0
 7256 -7257  7258  867 -7260 0
 7256 -7257  7258  867  7261 0

c  1-1 --> 0
c    (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0 ∧ -p_867) -> (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧ -b^{3, 290}_0)
c  in CNF:
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_2
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_1
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_0
c  in DIMACS:
 7256  7257 -7258  867 -7259 0
 7256  7257 -7258  867 -7260 0
 7256  7257 -7258  867 -7261 0

c  0-1 --> -1
c    (-b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧ -p_867) -> ( b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0)
c  in CNF:
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨  b^{3, 290}_2
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_1
c     b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨  b^{3, 290}_0
c  in DIMACS:
 7256  7257  7258  867  7259 0
 7256  7257  7258  867 -7260 0
 7256  7257  7258  867  7261 0

c  -1-1 --> -2
c    ( b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧  b^{3, 289}_0 ∧ -p_867) -> ( b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0)
c  in CNF:
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨  b^{3, 290}_2
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨  b^{3, 290}_1
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨  p_867 ∨ -b^{3, 290}_0
c  in DIMACS:
-7256  7257 -7258  867  7259 0
-7256  7257 -7258  867  7260 0
-7256  7257 -7258  867 -7261 0

c  -2-1 --> break 
c    ( b^{3, 289}_2 ∧  b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧ -p_867) -> break
c  in CNF:
c    -b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨  b^{3, 289}_0 ∨  p_867 ∨ break
c  in DIMACS:
-7256 -7257  7258  867 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 289}_2 ∧ -b^{3, 289}_1 ∧ -b^{3, 289}_0 ∧ true) 
c  in CNF:
c    -b^{3, 289}_2 ∨  b^{3, 289}_1 ∨  b^{3, 289}_0 ∨ false 
c  in DIMACS:
-7256  7257  7258  0

c  3 does not represent an automaton state.
c    -(-b^{3, 289}_2 ∧  b^{3, 289}_1 ∧  b^{3, 289}_0 ∧ true) 
c  in CNF:
c     b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ false 
c  in DIMACS:
 7256 -7257 -7258  0
c  -3 does not represent an automaton state.
c    -( b^{3, 289}_2 ∧  b^{3, 289}_1 ∧  b^{3, 289}_0 ∧ true) 
c  in CNF:
c    -b^{3, 289}_2 ∨ -b^{3, 289}_1 ∨ -b^{3, 289}_0 ∨ false 
c  in DIMACS:
-7256 -7257 -7258  0

c i = 290
c  -2+1 --> -1
c    ( b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧  p_870) -> ( b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0)
c  in CNF:
c    -b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨  b^{3, 291}_2
c    -b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_1
c    -b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨  b^{3, 291}_0
c  in DIMACS:
-7259 -7260  7261 -870  7262 0
-7259 -7260  7261 -870 -7263 0
-7259 -7260  7261 -870  7264 0

c  -1+1 --> 0
c    ( b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0 ∧  p_870) -> (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧ -b^{3, 291}_0)
c  in CNF:
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_2
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_1
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_0
c  in DIMACS:
-7259  7260 -7261 -870 -7262 0
-7259  7260 -7261 -870 -7263 0
-7259  7260 -7261 -870 -7264 0

c  0+1 --> 1
c    (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧  p_870) -> (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0)
c  in CNF:
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_2
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_1
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨  b^{3, 291}_0
c  in DIMACS:
 7259  7260  7261 -870 -7262 0
 7259  7260  7261 -870 -7263 0
 7259  7260  7261 -870  7264 0

c  1+1 --> 2
c    (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0 ∧  p_870) -> (-b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0)
c  in CNF:
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_2
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨  b^{3, 291}_1
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ -p_870 ∨ -b^{3, 291}_0
c  in DIMACS:
 7259  7260 -7261 -870 -7262 0
 7259  7260 -7261 -870  7263 0
 7259  7260 -7261 -870 -7264 0

c  2+1 --> break 
c    (-b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧  p_870) -> break
c  in CNF:
c     b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 7259 -7260  7261 -870 1162 0


c  2-1 --> 1
c    (-b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧ -p_870) -> (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0)
c  in CNF:
c     b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_2
c     b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_1
c     b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨  b^{3, 291}_0
c  in DIMACS:
 7259 -7260  7261  870 -7262 0
 7259 -7260  7261  870 -7263 0
 7259 -7260  7261  870  7264 0

c  1-1 --> 0
c    (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0 ∧ -p_870) -> (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧ -b^{3, 291}_0)
c  in CNF:
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_2
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_1
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_0
c  in DIMACS:
 7259  7260 -7261  870 -7262 0
 7259  7260 -7261  870 -7263 0
 7259  7260 -7261  870 -7264 0

c  0-1 --> -1
c    (-b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧ -p_870) -> ( b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0)
c  in CNF:
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨  b^{3, 291}_2
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_1
c     b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨  b^{3, 291}_0
c  in DIMACS:
 7259  7260  7261  870  7262 0
 7259  7260  7261  870 -7263 0
 7259  7260  7261  870  7264 0

c  -1-1 --> -2
c    ( b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧  b^{3, 290}_0 ∧ -p_870) -> ( b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0)
c  in CNF:
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨  b^{3, 291}_2
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨  b^{3, 291}_1
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨  p_870 ∨ -b^{3, 291}_0
c  in DIMACS:
-7259  7260 -7261  870  7262 0
-7259  7260 -7261  870  7263 0
-7259  7260 -7261  870 -7264 0

c  -2-1 --> break 
c    ( b^{3, 290}_2 ∧  b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨  b^{3, 290}_0 ∨  p_870 ∨ break
c  in DIMACS:
-7259 -7260  7261  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 290}_2 ∧ -b^{3, 290}_1 ∧ -b^{3, 290}_0 ∧ true) 
c  in CNF:
c    -b^{3, 290}_2 ∨  b^{3, 290}_1 ∨  b^{3, 290}_0 ∨ false 
c  in DIMACS:
-7259  7260  7261  0

c  3 does not represent an automaton state.
c    -(-b^{3, 290}_2 ∧  b^{3, 290}_1 ∧  b^{3, 290}_0 ∧ true) 
c  in CNF:
c     b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ false 
c  in DIMACS:
 7259 -7260 -7261  0
c  -3 does not represent an automaton state.
c    -( b^{3, 290}_2 ∧  b^{3, 290}_1 ∧  b^{3, 290}_0 ∧ true) 
c  in CNF:
c    -b^{3, 290}_2 ∨ -b^{3, 290}_1 ∨ -b^{3, 290}_0 ∨ false 
c  in DIMACS:
-7259 -7260 -7261  0

c i = 291
c  -2+1 --> -1
c    ( b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧  p_873) -> ( b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0)
c  in CNF:
c    -b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨  b^{3, 292}_2
c    -b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_1
c    -b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨  b^{3, 292}_0
c  in DIMACS:
-7262 -7263  7264 -873  7265 0
-7262 -7263  7264 -873 -7266 0
-7262 -7263  7264 -873  7267 0

c  -1+1 --> 0
c    ( b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0 ∧  p_873) -> (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧ -b^{3, 292}_0)
c  in CNF:
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_2
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_1
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_0
c  in DIMACS:
-7262  7263 -7264 -873 -7265 0
-7262  7263 -7264 -873 -7266 0
-7262  7263 -7264 -873 -7267 0

c  0+1 --> 1
c    (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧  p_873) -> (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0)
c  in CNF:
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_2
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_1
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨  b^{3, 292}_0
c  in DIMACS:
 7262  7263  7264 -873 -7265 0
 7262  7263  7264 -873 -7266 0
 7262  7263  7264 -873  7267 0

c  1+1 --> 2
c    (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0 ∧  p_873) -> (-b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0)
c  in CNF:
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_2
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨  b^{3, 292}_1
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ -p_873 ∨ -b^{3, 292}_0
c  in DIMACS:
 7262  7263 -7264 -873 -7265 0
 7262  7263 -7264 -873  7266 0
 7262  7263 -7264 -873 -7267 0

c  2+1 --> break 
c    (-b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧  p_873) -> break
c  in CNF:
c     b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ -p_873 ∨ break
c  in DIMACS:
 7262 -7263  7264 -873 1162 0


c  2-1 --> 1
c    (-b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧ -p_873) -> (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0)
c  in CNF:
c     b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_2
c     b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_1
c     b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨  b^{3, 292}_0
c  in DIMACS:
 7262 -7263  7264  873 -7265 0
 7262 -7263  7264  873 -7266 0
 7262 -7263  7264  873  7267 0

c  1-1 --> 0
c    (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0 ∧ -p_873) -> (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧ -b^{3, 292}_0)
c  in CNF:
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_2
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_1
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_0
c  in DIMACS:
 7262  7263 -7264  873 -7265 0
 7262  7263 -7264  873 -7266 0
 7262  7263 -7264  873 -7267 0

c  0-1 --> -1
c    (-b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧ -p_873) -> ( b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0)
c  in CNF:
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨  b^{3, 292}_2
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_1
c     b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨  b^{3, 292}_0
c  in DIMACS:
 7262  7263  7264  873  7265 0
 7262  7263  7264  873 -7266 0
 7262  7263  7264  873  7267 0

c  -1-1 --> -2
c    ( b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧  b^{3, 291}_0 ∧ -p_873) -> ( b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0)
c  in CNF:
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨  b^{3, 292}_2
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨  b^{3, 292}_1
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨  p_873 ∨ -b^{3, 292}_0
c  in DIMACS:
-7262  7263 -7264  873  7265 0
-7262  7263 -7264  873  7266 0
-7262  7263 -7264  873 -7267 0

c  -2-1 --> break 
c    ( b^{3, 291}_2 ∧  b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧ -p_873) -> break
c  in CNF:
c    -b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨  b^{3, 291}_0 ∨  p_873 ∨ break
c  in DIMACS:
-7262 -7263  7264  873 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 291}_2 ∧ -b^{3, 291}_1 ∧ -b^{3, 291}_0 ∧ true) 
c  in CNF:
c    -b^{3, 291}_2 ∨  b^{3, 291}_1 ∨  b^{3, 291}_0 ∨ false 
c  in DIMACS:
-7262  7263  7264  0

c  3 does not represent an automaton state.
c    -(-b^{3, 291}_2 ∧  b^{3, 291}_1 ∧  b^{3, 291}_0 ∧ true) 
c  in CNF:
c     b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ false 
c  in DIMACS:
 7262 -7263 -7264  0
c  -3 does not represent an automaton state.
c    -( b^{3, 291}_2 ∧  b^{3, 291}_1 ∧  b^{3, 291}_0 ∧ true) 
c  in CNF:
c    -b^{3, 291}_2 ∨ -b^{3, 291}_1 ∨ -b^{3, 291}_0 ∨ false 
c  in DIMACS:
-7262 -7263 -7264  0

c i = 292
c  -2+1 --> -1
c    ( b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧  p_876) -> ( b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0)
c  in CNF:
c    -b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨  b^{3, 293}_2
c    -b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_1
c    -b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨  b^{3, 293}_0
c  in DIMACS:
-7265 -7266  7267 -876  7268 0
-7265 -7266  7267 -876 -7269 0
-7265 -7266  7267 -876  7270 0

c  -1+1 --> 0
c    ( b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0 ∧  p_876) -> (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧ -b^{3, 293}_0)
c  in CNF:
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_2
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_1
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_0
c  in DIMACS:
-7265  7266 -7267 -876 -7268 0
-7265  7266 -7267 -876 -7269 0
-7265  7266 -7267 -876 -7270 0

c  0+1 --> 1
c    (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧  p_876) -> (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0)
c  in CNF:
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_2
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_1
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨  b^{3, 293}_0
c  in DIMACS:
 7265  7266  7267 -876 -7268 0
 7265  7266  7267 -876 -7269 0
 7265  7266  7267 -876  7270 0

c  1+1 --> 2
c    (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0 ∧  p_876) -> (-b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0)
c  in CNF:
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_2
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨  b^{3, 293}_1
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ -p_876 ∨ -b^{3, 293}_0
c  in DIMACS:
 7265  7266 -7267 -876 -7268 0
 7265  7266 -7267 -876  7269 0
 7265  7266 -7267 -876 -7270 0

c  2+1 --> break 
c    (-b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧  p_876) -> break
c  in CNF:
c     b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 7265 -7266  7267 -876 1162 0


c  2-1 --> 1
c    (-b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧ -p_876) -> (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0)
c  in CNF:
c     b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_2
c     b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_1
c     b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨  b^{3, 293}_0
c  in DIMACS:
 7265 -7266  7267  876 -7268 0
 7265 -7266  7267  876 -7269 0
 7265 -7266  7267  876  7270 0

c  1-1 --> 0
c    (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0 ∧ -p_876) -> (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧ -b^{3, 293}_0)
c  in CNF:
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_2
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_1
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_0
c  in DIMACS:
 7265  7266 -7267  876 -7268 0
 7265  7266 -7267  876 -7269 0
 7265  7266 -7267  876 -7270 0

c  0-1 --> -1
c    (-b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧ -p_876) -> ( b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0)
c  in CNF:
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨  b^{3, 293}_2
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_1
c     b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨  b^{3, 293}_0
c  in DIMACS:
 7265  7266  7267  876  7268 0
 7265  7266  7267  876 -7269 0
 7265  7266  7267  876  7270 0

c  -1-1 --> -2
c    ( b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧  b^{3, 292}_0 ∧ -p_876) -> ( b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0)
c  in CNF:
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨  b^{3, 293}_2
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨  b^{3, 293}_1
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨  p_876 ∨ -b^{3, 293}_0
c  in DIMACS:
-7265  7266 -7267  876  7268 0
-7265  7266 -7267  876  7269 0
-7265  7266 -7267  876 -7270 0

c  -2-1 --> break 
c    ( b^{3, 292}_2 ∧  b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨  b^{3, 292}_0 ∨  p_876 ∨ break
c  in DIMACS:
-7265 -7266  7267  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 292}_2 ∧ -b^{3, 292}_1 ∧ -b^{3, 292}_0 ∧ true) 
c  in CNF:
c    -b^{3, 292}_2 ∨  b^{3, 292}_1 ∨  b^{3, 292}_0 ∨ false 
c  in DIMACS:
-7265  7266  7267  0

c  3 does not represent an automaton state.
c    -(-b^{3, 292}_2 ∧  b^{3, 292}_1 ∧  b^{3, 292}_0 ∧ true) 
c  in CNF:
c     b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ false 
c  in DIMACS:
 7265 -7266 -7267  0
c  -3 does not represent an automaton state.
c    -( b^{3, 292}_2 ∧  b^{3, 292}_1 ∧  b^{3, 292}_0 ∧ true) 
c  in CNF:
c    -b^{3, 292}_2 ∨ -b^{3, 292}_1 ∨ -b^{3, 292}_0 ∨ false 
c  in DIMACS:
-7265 -7266 -7267  0

c i = 293
c  -2+1 --> -1
c    ( b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧  p_879) -> ( b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0)
c  in CNF:
c    -b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨  b^{3, 294}_2
c    -b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_1
c    -b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨  b^{3, 294}_0
c  in DIMACS:
-7268 -7269  7270 -879  7271 0
-7268 -7269  7270 -879 -7272 0
-7268 -7269  7270 -879  7273 0

c  -1+1 --> 0
c    ( b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0 ∧  p_879) -> (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧ -b^{3, 294}_0)
c  in CNF:
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_2
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_1
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_0
c  in DIMACS:
-7268  7269 -7270 -879 -7271 0
-7268  7269 -7270 -879 -7272 0
-7268  7269 -7270 -879 -7273 0

c  0+1 --> 1
c    (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧  p_879) -> (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0)
c  in CNF:
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_2
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_1
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨  b^{3, 294}_0
c  in DIMACS:
 7268  7269  7270 -879 -7271 0
 7268  7269  7270 -879 -7272 0
 7268  7269  7270 -879  7273 0

c  1+1 --> 2
c    (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0 ∧  p_879) -> (-b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0)
c  in CNF:
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_2
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨  b^{3, 294}_1
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ -p_879 ∨ -b^{3, 294}_0
c  in DIMACS:
 7268  7269 -7270 -879 -7271 0
 7268  7269 -7270 -879  7272 0
 7268  7269 -7270 -879 -7273 0

c  2+1 --> break 
c    (-b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧  p_879) -> break
c  in CNF:
c     b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ -p_879 ∨ break
c  in DIMACS:
 7268 -7269  7270 -879 1162 0


c  2-1 --> 1
c    (-b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧ -p_879) -> (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0)
c  in CNF:
c     b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_2
c     b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_1
c     b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨  b^{3, 294}_0
c  in DIMACS:
 7268 -7269  7270  879 -7271 0
 7268 -7269  7270  879 -7272 0
 7268 -7269  7270  879  7273 0

c  1-1 --> 0
c    (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0 ∧ -p_879) -> (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧ -b^{3, 294}_0)
c  in CNF:
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_2
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_1
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_0
c  in DIMACS:
 7268  7269 -7270  879 -7271 0
 7268  7269 -7270  879 -7272 0
 7268  7269 -7270  879 -7273 0

c  0-1 --> -1
c    (-b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧ -p_879) -> ( b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0)
c  in CNF:
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨  b^{3, 294}_2
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_1
c     b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨  b^{3, 294}_0
c  in DIMACS:
 7268  7269  7270  879  7271 0
 7268  7269  7270  879 -7272 0
 7268  7269  7270  879  7273 0

c  -1-1 --> -2
c    ( b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧  b^{3, 293}_0 ∧ -p_879) -> ( b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0)
c  in CNF:
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨  b^{3, 294}_2
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨  b^{3, 294}_1
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨  p_879 ∨ -b^{3, 294}_0
c  in DIMACS:
-7268  7269 -7270  879  7271 0
-7268  7269 -7270  879  7272 0
-7268  7269 -7270  879 -7273 0

c  -2-1 --> break 
c    ( b^{3, 293}_2 ∧  b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧ -p_879) -> break
c  in CNF:
c    -b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨  b^{3, 293}_0 ∨  p_879 ∨ break
c  in DIMACS:
-7268 -7269  7270  879 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 293}_2 ∧ -b^{3, 293}_1 ∧ -b^{3, 293}_0 ∧ true) 
c  in CNF:
c    -b^{3, 293}_2 ∨  b^{3, 293}_1 ∨  b^{3, 293}_0 ∨ false 
c  in DIMACS:
-7268  7269  7270  0

c  3 does not represent an automaton state.
c    -(-b^{3, 293}_2 ∧  b^{3, 293}_1 ∧  b^{3, 293}_0 ∧ true) 
c  in CNF:
c     b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ false 
c  in DIMACS:
 7268 -7269 -7270  0
c  -3 does not represent an automaton state.
c    -( b^{3, 293}_2 ∧  b^{3, 293}_1 ∧  b^{3, 293}_0 ∧ true) 
c  in CNF:
c    -b^{3, 293}_2 ∨ -b^{3, 293}_1 ∨ -b^{3, 293}_0 ∨ false 
c  in DIMACS:
-7268 -7269 -7270  0

c i = 294
c  -2+1 --> -1
c    ( b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧  p_882) -> ( b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0)
c  in CNF:
c    -b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨  b^{3, 295}_2
c    -b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_1
c    -b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨  b^{3, 295}_0
c  in DIMACS:
-7271 -7272  7273 -882  7274 0
-7271 -7272  7273 -882 -7275 0
-7271 -7272  7273 -882  7276 0

c  -1+1 --> 0
c    ( b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0 ∧  p_882) -> (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧ -b^{3, 295}_0)
c  in CNF:
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_2
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_1
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_0
c  in DIMACS:
-7271  7272 -7273 -882 -7274 0
-7271  7272 -7273 -882 -7275 0
-7271  7272 -7273 -882 -7276 0

c  0+1 --> 1
c    (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧  p_882) -> (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0)
c  in CNF:
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_2
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_1
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨  b^{3, 295}_0
c  in DIMACS:
 7271  7272  7273 -882 -7274 0
 7271  7272  7273 -882 -7275 0
 7271  7272  7273 -882  7276 0

c  1+1 --> 2
c    (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0 ∧  p_882) -> (-b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0)
c  in CNF:
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_2
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨  b^{3, 295}_1
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ -p_882 ∨ -b^{3, 295}_0
c  in DIMACS:
 7271  7272 -7273 -882 -7274 0
 7271  7272 -7273 -882  7275 0
 7271  7272 -7273 -882 -7276 0

c  2+1 --> break 
c    (-b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧  p_882) -> break
c  in CNF:
c     b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 7271 -7272  7273 -882 1162 0


c  2-1 --> 1
c    (-b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧ -p_882) -> (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0)
c  in CNF:
c     b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_2
c     b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_1
c     b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨  b^{3, 295}_0
c  in DIMACS:
 7271 -7272  7273  882 -7274 0
 7271 -7272  7273  882 -7275 0
 7271 -7272  7273  882  7276 0

c  1-1 --> 0
c    (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0 ∧ -p_882) -> (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧ -b^{3, 295}_0)
c  in CNF:
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_2
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_1
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_0
c  in DIMACS:
 7271  7272 -7273  882 -7274 0
 7271  7272 -7273  882 -7275 0
 7271  7272 -7273  882 -7276 0

c  0-1 --> -1
c    (-b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧ -p_882) -> ( b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0)
c  in CNF:
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨  b^{3, 295}_2
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_1
c     b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨  b^{3, 295}_0
c  in DIMACS:
 7271  7272  7273  882  7274 0
 7271  7272  7273  882 -7275 0
 7271  7272  7273  882  7276 0

c  -1-1 --> -2
c    ( b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧  b^{3, 294}_0 ∧ -p_882) -> ( b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0)
c  in CNF:
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨  b^{3, 295}_2
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨  b^{3, 295}_1
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨  p_882 ∨ -b^{3, 295}_0
c  in DIMACS:
-7271  7272 -7273  882  7274 0
-7271  7272 -7273  882  7275 0
-7271  7272 -7273  882 -7276 0

c  -2-1 --> break 
c    ( b^{3, 294}_2 ∧  b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨  b^{3, 294}_0 ∨  p_882 ∨ break
c  in DIMACS:
-7271 -7272  7273  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 294}_2 ∧ -b^{3, 294}_1 ∧ -b^{3, 294}_0 ∧ true) 
c  in CNF:
c    -b^{3, 294}_2 ∨  b^{3, 294}_1 ∨  b^{3, 294}_0 ∨ false 
c  in DIMACS:
-7271  7272  7273  0

c  3 does not represent an automaton state.
c    -(-b^{3, 294}_2 ∧  b^{3, 294}_1 ∧  b^{3, 294}_0 ∧ true) 
c  in CNF:
c     b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ false 
c  in DIMACS:
 7271 -7272 -7273  0
c  -3 does not represent an automaton state.
c    -( b^{3, 294}_2 ∧  b^{3, 294}_1 ∧  b^{3, 294}_0 ∧ true) 
c  in CNF:
c    -b^{3, 294}_2 ∨ -b^{3, 294}_1 ∨ -b^{3, 294}_0 ∨ false 
c  in DIMACS:
-7271 -7272 -7273  0

c i = 295
c  -2+1 --> -1
c    ( b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧  p_885) -> ( b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0)
c  in CNF:
c    -b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨  b^{3, 296}_2
c    -b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_1
c    -b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨  b^{3, 296}_0
c  in DIMACS:
-7274 -7275  7276 -885  7277 0
-7274 -7275  7276 -885 -7278 0
-7274 -7275  7276 -885  7279 0

c  -1+1 --> 0
c    ( b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0 ∧  p_885) -> (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧ -b^{3, 296}_0)
c  in CNF:
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_2
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_1
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_0
c  in DIMACS:
-7274  7275 -7276 -885 -7277 0
-7274  7275 -7276 -885 -7278 0
-7274  7275 -7276 -885 -7279 0

c  0+1 --> 1
c    (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧  p_885) -> (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0)
c  in CNF:
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_2
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_1
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨  b^{3, 296}_0
c  in DIMACS:
 7274  7275  7276 -885 -7277 0
 7274  7275  7276 -885 -7278 0
 7274  7275  7276 -885  7279 0

c  1+1 --> 2
c    (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0 ∧  p_885) -> (-b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0)
c  in CNF:
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_2
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨  b^{3, 296}_1
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ -p_885 ∨ -b^{3, 296}_0
c  in DIMACS:
 7274  7275 -7276 -885 -7277 0
 7274  7275 -7276 -885  7278 0
 7274  7275 -7276 -885 -7279 0

c  2+1 --> break 
c    (-b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧  p_885) -> break
c  in CNF:
c     b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 7274 -7275  7276 -885 1162 0


c  2-1 --> 1
c    (-b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧ -p_885) -> (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0)
c  in CNF:
c     b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_2
c     b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_1
c     b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨  b^{3, 296}_0
c  in DIMACS:
 7274 -7275  7276  885 -7277 0
 7274 -7275  7276  885 -7278 0
 7274 -7275  7276  885  7279 0

c  1-1 --> 0
c    (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0 ∧ -p_885) -> (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧ -b^{3, 296}_0)
c  in CNF:
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_2
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_1
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_0
c  in DIMACS:
 7274  7275 -7276  885 -7277 0
 7274  7275 -7276  885 -7278 0
 7274  7275 -7276  885 -7279 0

c  0-1 --> -1
c    (-b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧ -p_885) -> ( b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0)
c  in CNF:
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨  b^{3, 296}_2
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_1
c     b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨  b^{3, 296}_0
c  in DIMACS:
 7274  7275  7276  885  7277 0
 7274  7275  7276  885 -7278 0
 7274  7275  7276  885  7279 0

c  -1-1 --> -2
c    ( b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧  b^{3, 295}_0 ∧ -p_885) -> ( b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0)
c  in CNF:
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨  b^{3, 296}_2
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨  b^{3, 296}_1
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨  p_885 ∨ -b^{3, 296}_0
c  in DIMACS:
-7274  7275 -7276  885  7277 0
-7274  7275 -7276  885  7278 0
-7274  7275 -7276  885 -7279 0

c  -2-1 --> break 
c    ( b^{3, 295}_2 ∧  b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨  b^{3, 295}_0 ∨  p_885 ∨ break
c  in DIMACS:
-7274 -7275  7276  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 295}_2 ∧ -b^{3, 295}_1 ∧ -b^{3, 295}_0 ∧ true) 
c  in CNF:
c    -b^{3, 295}_2 ∨  b^{3, 295}_1 ∨  b^{3, 295}_0 ∨ false 
c  in DIMACS:
-7274  7275  7276  0

c  3 does not represent an automaton state.
c    -(-b^{3, 295}_2 ∧  b^{3, 295}_1 ∧  b^{3, 295}_0 ∧ true) 
c  in CNF:
c     b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ false 
c  in DIMACS:
 7274 -7275 -7276  0
c  -3 does not represent an automaton state.
c    -( b^{3, 295}_2 ∧  b^{3, 295}_1 ∧  b^{3, 295}_0 ∧ true) 
c  in CNF:
c    -b^{3, 295}_2 ∨ -b^{3, 295}_1 ∨ -b^{3, 295}_0 ∨ false 
c  in DIMACS:
-7274 -7275 -7276  0

c i = 296
c  -2+1 --> -1
c    ( b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧  p_888) -> ( b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0)
c  in CNF:
c    -b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨  b^{3, 297}_2
c    -b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_1
c    -b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨  b^{3, 297}_0
c  in DIMACS:
-7277 -7278  7279 -888  7280 0
-7277 -7278  7279 -888 -7281 0
-7277 -7278  7279 -888  7282 0

c  -1+1 --> 0
c    ( b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0 ∧  p_888) -> (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧ -b^{3, 297}_0)
c  in CNF:
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_2
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_1
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_0
c  in DIMACS:
-7277  7278 -7279 -888 -7280 0
-7277  7278 -7279 -888 -7281 0
-7277  7278 -7279 -888 -7282 0

c  0+1 --> 1
c    (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧  p_888) -> (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0)
c  in CNF:
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_2
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_1
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨  b^{3, 297}_0
c  in DIMACS:
 7277  7278  7279 -888 -7280 0
 7277  7278  7279 -888 -7281 0
 7277  7278  7279 -888  7282 0

c  1+1 --> 2
c    (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0 ∧  p_888) -> (-b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0)
c  in CNF:
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_2
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨  b^{3, 297}_1
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ -p_888 ∨ -b^{3, 297}_0
c  in DIMACS:
 7277  7278 -7279 -888 -7280 0
 7277  7278 -7279 -888  7281 0
 7277  7278 -7279 -888 -7282 0

c  2+1 --> break 
c    (-b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧  p_888) -> break
c  in CNF:
c     b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 7277 -7278  7279 -888 1162 0


c  2-1 --> 1
c    (-b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧ -p_888) -> (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0)
c  in CNF:
c     b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_2
c     b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_1
c     b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨  b^{3, 297}_0
c  in DIMACS:
 7277 -7278  7279  888 -7280 0
 7277 -7278  7279  888 -7281 0
 7277 -7278  7279  888  7282 0

c  1-1 --> 0
c    (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0 ∧ -p_888) -> (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧ -b^{3, 297}_0)
c  in CNF:
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_2
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_1
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_0
c  in DIMACS:
 7277  7278 -7279  888 -7280 0
 7277  7278 -7279  888 -7281 0
 7277  7278 -7279  888 -7282 0

c  0-1 --> -1
c    (-b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧ -p_888) -> ( b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0)
c  in CNF:
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨  b^{3, 297}_2
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_1
c     b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨  b^{3, 297}_0
c  in DIMACS:
 7277  7278  7279  888  7280 0
 7277  7278  7279  888 -7281 0
 7277  7278  7279  888  7282 0

c  -1-1 --> -2
c    ( b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧  b^{3, 296}_0 ∧ -p_888) -> ( b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0)
c  in CNF:
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨  b^{3, 297}_2
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨  b^{3, 297}_1
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨  p_888 ∨ -b^{3, 297}_0
c  in DIMACS:
-7277  7278 -7279  888  7280 0
-7277  7278 -7279  888  7281 0
-7277  7278 -7279  888 -7282 0

c  -2-1 --> break 
c    ( b^{3, 296}_2 ∧  b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨  b^{3, 296}_0 ∨  p_888 ∨ break
c  in DIMACS:
-7277 -7278  7279  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 296}_2 ∧ -b^{3, 296}_1 ∧ -b^{3, 296}_0 ∧ true) 
c  in CNF:
c    -b^{3, 296}_2 ∨  b^{3, 296}_1 ∨  b^{3, 296}_0 ∨ false 
c  in DIMACS:
-7277  7278  7279  0

c  3 does not represent an automaton state.
c    -(-b^{3, 296}_2 ∧  b^{3, 296}_1 ∧  b^{3, 296}_0 ∧ true) 
c  in CNF:
c     b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ false 
c  in DIMACS:
 7277 -7278 -7279  0
c  -3 does not represent an automaton state.
c    -( b^{3, 296}_2 ∧  b^{3, 296}_1 ∧  b^{3, 296}_0 ∧ true) 
c  in CNF:
c    -b^{3, 296}_2 ∨ -b^{3, 296}_1 ∨ -b^{3, 296}_0 ∨ false 
c  in DIMACS:
-7277 -7278 -7279  0

c i = 297
c  -2+1 --> -1
c    ( b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧  p_891) -> ( b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0)
c  in CNF:
c    -b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨  b^{3, 298}_2
c    -b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_1
c    -b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨  b^{3, 298}_0
c  in DIMACS:
-7280 -7281  7282 -891  7283 0
-7280 -7281  7282 -891 -7284 0
-7280 -7281  7282 -891  7285 0

c  -1+1 --> 0
c    ( b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0 ∧  p_891) -> (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧ -b^{3, 298}_0)
c  in CNF:
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_2
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_1
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_0
c  in DIMACS:
-7280  7281 -7282 -891 -7283 0
-7280  7281 -7282 -891 -7284 0
-7280  7281 -7282 -891 -7285 0

c  0+1 --> 1
c    (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧  p_891) -> (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0)
c  in CNF:
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_2
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_1
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨  b^{3, 298}_0
c  in DIMACS:
 7280  7281  7282 -891 -7283 0
 7280  7281  7282 -891 -7284 0
 7280  7281  7282 -891  7285 0

c  1+1 --> 2
c    (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0 ∧  p_891) -> (-b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0)
c  in CNF:
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_2
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨  b^{3, 298}_1
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ -p_891 ∨ -b^{3, 298}_0
c  in DIMACS:
 7280  7281 -7282 -891 -7283 0
 7280  7281 -7282 -891  7284 0
 7280  7281 -7282 -891 -7285 0

c  2+1 --> break 
c    (-b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧  p_891) -> break
c  in CNF:
c     b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 7280 -7281  7282 -891 1162 0


c  2-1 --> 1
c    (-b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧ -p_891) -> (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0)
c  in CNF:
c     b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_2
c     b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_1
c     b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨  b^{3, 298}_0
c  in DIMACS:
 7280 -7281  7282  891 -7283 0
 7280 -7281  7282  891 -7284 0
 7280 -7281  7282  891  7285 0

c  1-1 --> 0
c    (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0 ∧ -p_891) -> (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧ -b^{3, 298}_0)
c  in CNF:
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_2
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_1
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_0
c  in DIMACS:
 7280  7281 -7282  891 -7283 0
 7280  7281 -7282  891 -7284 0
 7280  7281 -7282  891 -7285 0

c  0-1 --> -1
c    (-b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧ -p_891) -> ( b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0)
c  in CNF:
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨  b^{3, 298}_2
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_1
c     b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨  b^{3, 298}_0
c  in DIMACS:
 7280  7281  7282  891  7283 0
 7280  7281  7282  891 -7284 0
 7280  7281  7282  891  7285 0

c  -1-1 --> -2
c    ( b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧  b^{3, 297}_0 ∧ -p_891) -> ( b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0)
c  in CNF:
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨  b^{3, 298}_2
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨  b^{3, 298}_1
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨  p_891 ∨ -b^{3, 298}_0
c  in DIMACS:
-7280  7281 -7282  891  7283 0
-7280  7281 -7282  891  7284 0
-7280  7281 -7282  891 -7285 0

c  -2-1 --> break 
c    ( b^{3, 297}_2 ∧  b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨  b^{3, 297}_0 ∨  p_891 ∨ break
c  in DIMACS:
-7280 -7281  7282  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 297}_2 ∧ -b^{3, 297}_1 ∧ -b^{3, 297}_0 ∧ true) 
c  in CNF:
c    -b^{3, 297}_2 ∨  b^{3, 297}_1 ∨  b^{3, 297}_0 ∨ false 
c  in DIMACS:
-7280  7281  7282  0

c  3 does not represent an automaton state.
c    -(-b^{3, 297}_2 ∧  b^{3, 297}_1 ∧  b^{3, 297}_0 ∧ true) 
c  in CNF:
c     b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ false 
c  in DIMACS:
 7280 -7281 -7282  0
c  -3 does not represent an automaton state.
c    -( b^{3, 297}_2 ∧  b^{3, 297}_1 ∧  b^{3, 297}_0 ∧ true) 
c  in CNF:
c    -b^{3, 297}_2 ∨ -b^{3, 297}_1 ∨ -b^{3, 297}_0 ∨ false 
c  in DIMACS:
-7280 -7281 -7282  0

c i = 298
c  -2+1 --> -1
c    ( b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧  p_894) -> ( b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0)
c  in CNF:
c    -b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨  b^{3, 299}_2
c    -b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_1
c    -b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨  b^{3, 299}_0
c  in DIMACS:
-7283 -7284  7285 -894  7286 0
-7283 -7284  7285 -894 -7287 0
-7283 -7284  7285 -894  7288 0

c  -1+1 --> 0
c    ( b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0 ∧  p_894) -> (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧ -b^{3, 299}_0)
c  in CNF:
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_2
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_1
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_0
c  in DIMACS:
-7283  7284 -7285 -894 -7286 0
-7283  7284 -7285 -894 -7287 0
-7283  7284 -7285 -894 -7288 0

c  0+1 --> 1
c    (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧  p_894) -> (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0)
c  in CNF:
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_2
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_1
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨  b^{3, 299}_0
c  in DIMACS:
 7283  7284  7285 -894 -7286 0
 7283  7284  7285 -894 -7287 0
 7283  7284  7285 -894  7288 0

c  1+1 --> 2
c    (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0 ∧  p_894) -> (-b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0)
c  in CNF:
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_2
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨  b^{3, 299}_1
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ -p_894 ∨ -b^{3, 299}_0
c  in DIMACS:
 7283  7284 -7285 -894 -7286 0
 7283  7284 -7285 -894  7287 0
 7283  7284 -7285 -894 -7288 0

c  2+1 --> break 
c    (-b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧  p_894) -> break
c  in CNF:
c     b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 7283 -7284  7285 -894 1162 0


c  2-1 --> 1
c    (-b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧ -p_894) -> (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0)
c  in CNF:
c     b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_2
c     b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_1
c     b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨  b^{3, 299}_0
c  in DIMACS:
 7283 -7284  7285  894 -7286 0
 7283 -7284  7285  894 -7287 0
 7283 -7284  7285  894  7288 0

c  1-1 --> 0
c    (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0 ∧ -p_894) -> (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧ -b^{3, 299}_0)
c  in CNF:
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_2
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_1
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_0
c  in DIMACS:
 7283  7284 -7285  894 -7286 0
 7283  7284 -7285  894 -7287 0
 7283  7284 -7285  894 -7288 0

c  0-1 --> -1
c    (-b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧ -p_894) -> ( b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0)
c  in CNF:
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨  b^{3, 299}_2
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_1
c     b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨  b^{3, 299}_0
c  in DIMACS:
 7283  7284  7285  894  7286 0
 7283  7284  7285  894 -7287 0
 7283  7284  7285  894  7288 0

c  -1-1 --> -2
c    ( b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧  b^{3, 298}_0 ∧ -p_894) -> ( b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0)
c  in CNF:
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨  b^{3, 299}_2
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨  b^{3, 299}_1
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨  p_894 ∨ -b^{3, 299}_0
c  in DIMACS:
-7283  7284 -7285  894  7286 0
-7283  7284 -7285  894  7287 0
-7283  7284 -7285  894 -7288 0

c  -2-1 --> break 
c    ( b^{3, 298}_2 ∧  b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨  b^{3, 298}_0 ∨  p_894 ∨ break
c  in DIMACS:
-7283 -7284  7285  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 298}_2 ∧ -b^{3, 298}_1 ∧ -b^{3, 298}_0 ∧ true) 
c  in CNF:
c    -b^{3, 298}_2 ∨  b^{3, 298}_1 ∨  b^{3, 298}_0 ∨ false 
c  in DIMACS:
-7283  7284  7285  0

c  3 does not represent an automaton state.
c    -(-b^{3, 298}_2 ∧  b^{3, 298}_1 ∧  b^{3, 298}_0 ∧ true) 
c  in CNF:
c     b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ false 
c  in DIMACS:
 7283 -7284 -7285  0
c  -3 does not represent an automaton state.
c    -( b^{3, 298}_2 ∧  b^{3, 298}_1 ∧  b^{3, 298}_0 ∧ true) 
c  in CNF:
c    -b^{3, 298}_2 ∨ -b^{3, 298}_1 ∨ -b^{3, 298}_0 ∨ false 
c  in DIMACS:
-7283 -7284 -7285  0

c i = 299
c  -2+1 --> -1
c    ( b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧  p_897) -> ( b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0)
c  in CNF:
c    -b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨  b^{3, 300}_2
c    -b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_1
c    -b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨  b^{3, 300}_0
c  in DIMACS:
-7286 -7287  7288 -897  7289 0
-7286 -7287  7288 -897 -7290 0
-7286 -7287  7288 -897  7291 0

c  -1+1 --> 0
c    ( b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0 ∧  p_897) -> (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧ -b^{3, 300}_0)
c  in CNF:
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_2
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_1
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_0
c  in DIMACS:
-7286  7287 -7288 -897 -7289 0
-7286  7287 -7288 -897 -7290 0
-7286  7287 -7288 -897 -7291 0

c  0+1 --> 1
c    (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧  p_897) -> (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0)
c  in CNF:
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_2
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_1
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨  b^{3, 300}_0
c  in DIMACS:
 7286  7287  7288 -897 -7289 0
 7286  7287  7288 -897 -7290 0
 7286  7287  7288 -897  7291 0

c  1+1 --> 2
c    (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0 ∧  p_897) -> (-b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0)
c  in CNF:
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_2
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨  b^{3, 300}_1
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ -p_897 ∨ -b^{3, 300}_0
c  in DIMACS:
 7286  7287 -7288 -897 -7289 0
 7286  7287 -7288 -897  7290 0
 7286  7287 -7288 -897 -7291 0

c  2+1 --> break 
c    (-b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧  p_897) -> break
c  in CNF:
c     b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 7286 -7287  7288 -897 1162 0


c  2-1 --> 1
c    (-b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧ -p_897) -> (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0)
c  in CNF:
c     b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_2
c     b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_1
c     b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨  b^{3, 300}_0
c  in DIMACS:
 7286 -7287  7288  897 -7289 0
 7286 -7287  7288  897 -7290 0
 7286 -7287  7288  897  7291 0

c  1-1 --> 0
c    (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0 ∧ -p_897) -> (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧ -b^{3, 300}_0)
c  in CNF:
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_2
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_1
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_0
c  in DIMACS:
 7286  7287 -7288  897 -7289 0
 7286  7287 -7288  897 -7290 0
 7286  7287 -7288  897 -7291 0

c  0-1 --> -1
c    (-b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧ -p_897) -> ( b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0)
c  in CNF:
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨  b^{3, 300}_2
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_1
c     b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨  b^{3, 300}_0
c  in DIMACS:
 7286  7287  7288  897  7289 0
 7286  7287  7288  897 -7290 0
 7286  7287  7288  897  7291 0

c  -1-1 --> -2
c    ( b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧  b^{3, 299}_0 ∧ -p_897) -> ( b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0)
c  in CNF:
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨  b^{3, 300}_2
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨  b^{3, 300}_1
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨  p_897 ∨ -b^{3, 300}_0
c  in DIMACS:
-7286  7287 -7288  897  7289 0
-7286  7287 -7288  897  7290 0
-7286  7287 -7288  897 -7291 0

c  -2-1 --> break 
c    ( b^{3, 299}_2 ∧  b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨  b^{3, 299}_0 ∨  p_897 ∨ break
c  in DIMACS:
-7286 -7287  7288  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 299}_2 ∧ -b^{3, 299}_1 ∧ -b^{3, 299}_0 ∧ true) 
c  in CNF:
c    -b^{3, 299}_2 ∨  b^{3, 299}_1 ∨  b^{3, 299}_0 ∨ false 
c  in DIMACS:
-7286  7287  7288  0

c  3 does not represent an automaton state.
c    -(-b^{3, 299}_2 ∧  b^{3, 299}_1 ∧  b^{3, 299}_0 ∧ true) 
c  in CNF:
c     b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ false 
c  in DIMACS:
 7286 -7287 -7288  0
c  -3 does not represent an automaton state.
c    -( b^{3, 299}_2 ∧  b^{3, 299}_1 ∧  b^{3, 299}_0 ∧ true) 
c  in CNF:
c    -b^{3, 299}_2 ∨ -b^{3, 299}_1 ∨ -b^{3, 299}_0 ∨ false 
c  in DIMACS:
-7286 -7287 -7288  0

c i = 300
c  -2+1 --> -1
c    ( b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧  p_900) -> ( b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0)
c  in CNF:
c    -b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨  b^{3, 301}_2
c    -b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_1
c    -b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨  b^{3, 301}_0
c  in DIMACS:
-7289 -7290  7291 -900  7292 0
-7289 -7290  7291 -900 -7293 0
-7289 -7290  7291 -900  7294 0

c  -1+1 --> 0
c    ( b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0 ∧  p_900) -> (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧ -b^{3, 301}_0)
c  in CNF:
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_2
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_1
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_0
c  in DIMACS:
-7289  7290 -7291 -900 -7292 0
-7289  7290 -7291 -900 -7293 0
-7289  7290 -7291 -900 -7294 0

c  0+1 --> 1
c    (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧  p_900) -> (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0)
c  in CNF:
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_2
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_1
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨  b^{3, 301}_0
c  in DIMACS:
 7289  7290  7291 -900 -7292 0
 7289  7290  7291 -900 -7293 0
 7289  7290  7291 -900  7294 0

c  1+1 --> 2
c    (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0 ∧  p_900) -> (-b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0)
c  in CNF:
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_2
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨  b^{3, 301}_1
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ -p_900 ∨ -b^{3, 301}_0
c  in DIMACS:
 7289  7290 -7291 -900 -7292 0
 7289  7290 -7291 -900  7293 0
 7289  7290 -7291 -900 -7294 0

c  2+1 --> break 
c    (-b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧  p_900) -> break
c  in CNF:
c     b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 7289 -7290  7291 -900 1162 0


c  2-1 --> 1
c    (-b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧ -p_900) -> (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0)
c  in CNF:
c     b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_2
c     b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_1
c     b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨  b^{3, 301}_0
c  in DIMACS:
 7289 -7290  7291  900 -7292 0
 7289 -7290  7291  900 -7293 0
 7289 -7290  7291  900  7294 0

c  1-1 --> 0
c    (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0 ∧ -p_900) -> (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧ -b^{3, 301}_0)
c  in CNF:
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_2
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_1
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_0
c  in DIMACS:
 7289  7290 -7291  900 -7292 0
 7289  7290 -7291  900 -7293 0
 7289  7290 -7291  900 -7294 0

c  0-1 --> -1
c    (-b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧ -p_900) -> ( b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0)
c  in CNF:
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨  b^{3, 301}_2
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_1
c     b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨  b^{3, 301}_0
c  in DIMACS:
 7289  7290  7291  900  7292 0
 7289  7290  7291  900 -7293 0
 7289  7290  7291  900  7294 0

c  -1-1 --> -2
c    ( b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧  b^{3, 300}_0 ∧ -p_900) -> ( b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0)
c  in CNF:
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨  b^{3, 301}_2
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨  b^{3, 301}_1
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨  p_900 ∨ -b^{3, 301}_0
c  in DIMACS:
-7289  7290 -7291  900  7292 0
-7289  7290 -7291  900  7293 0
-7289  7290 -7291  900 -7294 0

c  -2-1 --> break 
c    ( b^{3, 300}_2 ∧  b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨  b^{3, 300}_0 ∨  p_900 ∨ break
c  in DIMACS:
-7289 -7290  7291  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 300}_2 ∧ -b^{3, 300}_1 ∧ -b^{3, 300}_0 ∧ true) 
c  in CNF:
c    -b^{3, 300}_2 ∨  b^{3, 300}_1 ∨  b^{3, 300}_0 ∨ false 
c  in DIMACS:
-7289  7290  7291  0

c  3 does not represent an automaton state.
c    -(-b^{3, 300}_2 ∧  b^{3, 300}_1 ∧  b^{3, 300}_0 ∧ true) 
c  in CNF:
c     b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ false 
c  in DIMACS:
 7289 -7290 -7291  0
c  -3 does not represent an automaton state.
c    -( b^{3, 300}_2 ∧  b^{3, 300}_1 ∧  b^{3, 300}_0 ∧ true) 
c  in CNF:
c    -b^{3, 300}_2 ∨ -b^{3, 300}_1 ∨ -b^{3, 300}_0 ∨ false 
c  in DIMACS:
-7289 -7290 -7291  0

c i = 301
c  -2+1 --> -1
c    ( b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧  p_903) -> ( b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0)
c  in CNF:
c    -b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨  b^{3, 302}_2
c    -b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_1
c    -b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨  b^{3, 302}_0
c  in DIMACS:
-7292 -7293  7294 -903  7295 0
-7292 -7293  7294 -903 -7296 0
-7292 -7293  7294 -903  7297 0

c  -1+1 --> 0
c    ( b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0 ∧  p_903) -> (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧ -b^{3, 302}_0)
c  in CNF:
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_2
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_1
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_0
c  in DIMACS:
-7292  7293 -7294 -903 -7295 0
-7292  7293 -7294 -903 -7296 0
-7292  7293 -7294 -903 -7297 0

c  0+1 --> 1
c    (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧  p_903) -> (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0)
c  in CNF:
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_2
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_1
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨  b^{3, 302}_0
c  in DIMACS:
 7292  7293  7294 -903 -7295 0
 7292  7293  7294 -903 -7296 0
 7292  7293  7294 -903  7297 0

c  1+1 --> 2
c    (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0 ∧  p_903) -> (-b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0)
c  in CNF:
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_2
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨  b^{3, 302}_1
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ -p_903 ∨ -b^{3, 302}_0
c  in DIMACS:
 7292  7293 -7294 -903 -7295 0
 7292  7293 -7294 -903  7296 0
 7292  7293 -7294 -903 -7297 0

c  2+1 --> break 
c    (-b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧  p_903) -> break
c  in CNF:
c     b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 7292 -7293  7294 -903 1162 0


c  2-1 --> 1
c    (-b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧ -p_903) -> (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0)
c  in CNF:
c     b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_2
c     b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_1
c     b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨  b^{3, 302}_0
c  in DIMACS:
 7292 -7293  7294  903 -7295 0
 7292 -7293  7294  903 -7296 0
 7292 -7293  7294  903  7297 0

c  1-1 --> 0
c    (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0 ∧ -p_903) -> (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧ -b^{3, 302}_0)
c  in CNF:
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_2
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_1
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_0
c  in DIMACS:
 7292  7293 -7294  903 -7295 0
 7292  7293 -7294  903 -7296 0
 7292  7293 -7294  903 -7297 0

c  0-1 --> -1
c    (-b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧ -p_903) -> ( b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0)
c  in CNF:
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨  b^{3, 302}_2
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_1
c     b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨  b^{3, 302}_0
c  in DIMACS:
 7292  7293  7294  903  7295 0
 7292  7293  7294  903 -7296 0
 7292  7293  7294  903  7297 0

c  -1-1 --> -2
c    ( b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧  b^{3, 301}_0 ∧ -p_903) -> ( b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0)
c  in CNF:
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨  b^{3, 302}_2
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨  b^{3, 302}_1
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨  p_903 ∨ -b^{3, 302}_0
c  in DIMACS:
-7292  7293 -7294  903  7295 0
-7292  7293 -7294  903  7296 0
-7292  7293 -7294  903 -7297 0

c  -2-1 --> break 
c    ( b^{3, 301}_2 ∧  b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨  b^{3, 301}_0 ∨  p_903 ∨ break
c  in DIMACS:
-7292 -7293  7294  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 301}_2 ∧ -b^{3, 301}_1 ∧ -b^{3, 301}_0 ∧ true) 
c  in CNF:
c    -b^{3, 301}_2 ∨  b^{3, 301}_1 ∨  b^{3, 301}_0 ∨ false 
c  in DIMACS:
-7292  7293  7294  0

c  3 does not represent an automaton state.
c    -(-b^{3, 301}_2 ∧  b^{3, 301}_1 ∧  b^{3, 301}_0 ∧ true) 
c  in CNF:
c     b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ false 
c  in DIMACS:
 7292 -7293 -7294  0
c  -3 does not represent an automaton state.
c    -( b^{3, 301}_2 ∧  b^{3, 301}_1 ∧  b^{3, 301}_0 ∧ true) 
c  in CNF:
c    -b^{3, 301}_2 ∨ -b^{3, 301}_1 ∨ -b^{3, 301}_0 ∨ false 
c  in DIMACS:
-7292 -7293 -7294  0

c i = 302
c  -2+1 --> -1
c    ( b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧  p_906) -> ( b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0)
c  in CNF:
c    -b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨  b^{3, 303}_2
c    -b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_1
c    -b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨  b^{3, 303}_0
c  in DIMACS:
-7295 -7296  7297 -906  7298 0
-7295 -7296  7297 -906 -7299 0
-7295 -7296  7297 -906  7300 0

c  -1+1 --> 0
c    ( b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0 ∧  p_906) -> (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧ -b^{3, 303}_0)
c  in CNF:
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_2
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_1
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_0
c  in DIMACS:
-7295  7296 -7297 -906 -7298 0
-7295  7296 -7297 -906 -7299 0
-7295  7296 -7297 -906 -7300 0

c  0+1 --> 1
c    (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧  p_906) -> (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0)
c  in CNF:
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_2
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_1
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨  b^{3, 303}_0
c  in DIMACS:
 7295  7296  7297 -906 -7298 0
 7295  7296  7297 -906 -7299 0
 7295  7296  7297 -906  7300 0

c  1+1 --> 2
c    (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0 ∧  p_906) -> (-b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0)
c  in CNF:
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_2
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨  b^{3, 303}_1
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ -p_906 ∨ -b^{3, 303}_0
c  in DIMACS:
 7295  7296 -7297 -906 -7298 0
 7295  7296 -7297 -906  7299 0
 7295  7296 -7297 -906 -7300 0

c  2+1 --> break 
c    (-b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧  p_906) -> break
c  in CNF:
c     b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 7295 -7296  7297 -906 1162 0


c  2-1 --> 1
c    (-b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧ -p_906) -> (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0)
c  in CNF:
c     b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_2
c     b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_1
c     b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨  b^{3, 303}_0
c  in DIMACS:
 7295 -7296  7297  906 -7298 0
 7295 -7296  7297  906 -7299 0
 7295 -7296  7297  906  7300 0

c  1-1 --> 0
c    (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0 ∧ -p_906) -> (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧ -b^{3, 303}_0)
c  in CNF:
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_2
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_1
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_0
c  in DIMACS:
 7295  7296 -7297  906 -7298 0
 7295  7296 -7297  906 -7299 0
 7295  7296 -7297  906 -7300 0

c  0-1 --> -1
c    (-b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧ -p_906) -> ( b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0)
c  in CNF:
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨  b^{3, 303}_2
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_1
c     b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨  b^{3, 303}_0
c  in DIMACS:
 7295  7296  7297  906  7298 0
 7295  7296  7297  906 -7299 0
 7295  7296  7297  906  7300 0

c  -1-1 --> -2
c    ( b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧  b^{3, 302}_0 ∧ -p_906) -> ( b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0)
c  in CNF:
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨  b^{3, 303}_2
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨  b^{3, 303}_1
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨  p_906 ∨ -b^{3, 303}_0
c  in DIMACS:
-7295  7296 -7297  906  7298 0
-7295  7296 -7297  906  7299 0
-7295  7296 -7297  906 -7300 0

c  -2-1 --> break 
c    ( b^{3, 302}_2 ∧  b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨  b^{3, 302}_0 ∨  p_906 ∨ break
c  in DIMACS:
-7295 -7296  7297  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 302}_2 ∧ -b^{3, 302}_1 ∧ -b^{3, 302}_0 ∧ true) 
c  in CNF:
c    -b^{3, 302}_2 ∨  b^{3, 302}_1 ∨  b^{3, 302}_0 ∨ false 
c  in DIMACS:
-7295  7296  7297  0

c  3 does not represent an automaton state.
c    -(-b^{3, 302}_2 ∧  b^{3, 302}_1 ∧  b^{3, 302}_0 ∧ true) 
c  in CNF:
c     b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ false 
c  in DIMACS:
 7295 -7296 -7297  0
c  -3 does not represent an automaton state.
c    -( b^{3, 302}_2 ∧  b^{3, 302}_1 ∧  b^{3, 302}_0 ∧ true) 
c  in CNF:
c    -b^{3, 302}_2 ∨ -b^{3, 302}_1 ∨ -b^{3, 302}_0 ∨ false 
c  in DIMACS:
-7295 -7296 -7297  0

c i = 303
c  -2+1 --> -1
c    ( b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧  p_909) -> ( b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0)
c  in CNF:
c    -b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨  b^{3, 304}_2
c    -b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_1
c    -b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨  b^{3, 304}_0
c  in DIMACS:
-7298 -7299  7300 -909  7301 0
-7298 -7299  7300 -909 -7302 0
-7298 -7299  7300 -909  7303 0

c  -1+1 --> 0
c    ( b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0 ∧  p_909) -> (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧ -b^{3, 304}_0)
c  in CNF:
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_2
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_1
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_0
c  in DIMACS:
-7298  7299 -7300 -909 -7301 0
-7298  7299 -7300 -909 -7302 0
-7298  7299 -7300 -909 -7303 0

c  0+1 --> 1
c    (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧  p_909) -> (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0)
c  in CNF:
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_2
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_1
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨  b^{3, 304}_0
c  in DIMACS:
 7298  7299  7300 -909 -7301 0
 7298  7299  7300 -909 -7302 0
 7298  7299  7300 -909  7303 0

c  1+1 --> 2
c    (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0 ∧  p_909) -> (-b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0)
c  in CNF:
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_2
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨  b^{3, 304}_1
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ -p_909 ∨ -b^{3, 304}_0
c  in DIMACS:
 7298  7299 -7300 -909 -7301 0
 7298  7299 -7300 -909  7302 0
 7298  7299 -7300 -909 -7303 0

c  2+1 --> break 
c    (-b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧  p_909) -> break
c  in CNF:
c     b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ -p_909 ∨ break
c  in DIMACS:
 7298 -7299  7300 -909 1162 0


c  2-1 --> 1
c    (-b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧ -p_909) -> (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0)
c  in CNF:
c     b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_2
c     b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_1
c     b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨  b^{3, 304}_0
c  in DIMACS:
 7298 -7299  7300  909 -7301 0
 7298 -7299  7300  909 -7302 0
 7298 -7299  7300  909  7303 0

c  1-1 --> 0
c    (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0 ∧ -p_909) -> (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧ -b^{3, 304}_0)
c  in CNF:
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_2
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_1
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_0
c  in DIMACS:
 7298  7299 -7300  909 -7301 0
 7298  7299 -7300  909 -7302 0
 7298  7299 -7300  909 -7303 0

c  0-1 --> -1
c    (-b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧ -p_909) -> ( b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0)
c  in CNF:
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨  b^{3, 304}_2
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_1
c     b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨  b^{3, 304}_0
c  in DIMACS:
 7298  7299  7300  909  7301 0
 7298  7299  7300  909 -7302 0
 7298  7299  7300  909  7303 0

c  -1-1 --> -2
c    ( b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧  b^{3, 303}_0 ∧ -p_909) -> ( b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0)
c  in CNF:
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨  b^{3, 304}_2
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨  b^{3, 304}_1
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨  p_909 ∨ -b^{3, 304}_0
c  in DIMACS:
-7298  7299 -7300  909  7301 0
-7298  7299 -7300  909  7302 0
-7298  7299 -7300  909 -7303 0

c  -2-1 --> break 
c    ( b^{3, 303}_2 ∧  b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧ -p_909) -> break
c  in CNF:
c    -b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨  b^{3, 303}_0 ∨  p_909 ∨ break
c  in DIMACS:
-7298 -7299  7300  909 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 303}_2 ∧ -b^{3, 303}_1 ∧ -b^{3, 303}_0 ∧ true) 
c  in CNF:
c    -b^{3, 303}_2 ∨  b^{3, 303}_1 ∨  b^{3, 303}_0 ∨ false 
c  in DIMACS:
-7298  7299  7300  0

c  3 does not represent an automaton state.
c    -(-b^{3, 303}_2 ∧  b^{3, 303}_1 ∧  b^{3, 303}_0 ∧ true) 
c  in CNF:
c     b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ false 
c  in DIMACS:
 7298 -7299 -7300  0
c  -3 does not represent an automaton state.
c    -( b^{3, 303}_2 ∧  b^{3, 303}_1 ∧  b^{3, 303}_0 ∧ true) 
c  in CNF:
c    -b^{3, 303}_2 ∨ -b^{3, 303}_1 ∨ -b^{3, 303}_0 ∨ false 
c  in DIMACS:
-7298 -7299 -7300  0

c i = 304
c  -2+1 --> -1
c    ( b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧  p_912) -> ( b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0)
c  in CNF:
c    -b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨  b^{3, 305}_2
c    -b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_1
c    -b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨  b^{3, 305}_0
c  in DIMACS:
-7301 -7302  7303 -912  7304 0
-7301 -7302  7303 -912 -7305 0
-7301 -7302  7303 -912  7306 0

c  -1+1 --> 0
c    ( b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0 ∧  p_912) -> (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧ -b^{3, 305}_0)
c  in CNF:
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_2
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_1
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_0
c  in DIMACS:
-7301  7302 -7303 -912 -7304 0
-7301  7302 -7303 -912 -7305 0
-7301  7302 -7303 -912 -7306 0

c  0+1 --> 1
c    (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧  p_912) -> (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0)
c  in CNF:
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_2
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_1
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨  b^{3, 305}_0
c  in DIMACS:
 7301  7302  7303 -912 -7304 0
 7301  7302  7303 -912 -7305 0
 7301  7302  7303 -912  7306 0

c  1+1 --> 2
c    (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0 ∧  p_912) -> (-b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0)
c  in CNF:
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_2
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨  b^{3, 305}_1
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ -p_912 ∨ -b^{3, 305}_0
c  in DIMACS:
 7301  7302 -7303 -912 -7304 0
 7301  7302 -7303 -912  7305 0
 7301  7302 -7303 -912 -7306 0

c  2+1 --> break 
c    (-b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧  p_912) -> break
c  in CNF:
c     b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 7301 -7302  7303 -912 1162 0


c  2-1 --> 1
c    (-b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧ -p_912) -> (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0)
c  in CNF:
c     b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_2
c     b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_1
c     b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨  b^{3, 305}_0
c  in DIMACS:
 7301 -7302  7303  912 -7304 0
 7301 -7302  7303  912 -7305 0
 7301 -7302  7303  912  7306 0

c  1-1 --> 0
c    (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0 ∧ -p_912) -> (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧ -b^{3, 305}_0)
c  in CNF:
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_2
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_1
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_0
c  in DIMACS:
 7301  7302 -7303  912 -7304 0
 7301  7302 -7303  912 -7305 0
 7301  7302 -7303  912 -7306 0

c  0-1 --> -1
c    (-b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧ -p_912) -> ( b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0)
c  in CNF:
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨  b^{3, 305}_2
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_1
c     b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨  b^{3, 305}_0
c  in DIMACS:
 7301  7302  7303  912  7304 0
 7301  7302  7303  912 -7305 0
 7301  7302  7303  912  7306 0

c  -1-1 --> -2
c    ( b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧  b^{3, 304}_0 ∧ -p_912) -> ( b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0)
c  in CNF:
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨  b^{3, 305}_2
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨  b^{3, 305}_1
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨  p_912 ∨ -b^{3, 305}_0
c  in DIMACS:
-7301  7302 -7303  912  7304 0
-7301  7302 -7303  912  7305 0
-7301  7302 -7303  912 -7306 0

c  -2-1 --> break 
c    ( b^{3, 304}_2 ∧  b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨  b^{3, 304}_0 ∨  p_912 ∨ break
c  in DIMACS:
-7301 -7302  7303  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 304}_2 ∧ -b^{3, 304}_1 ∧ -b^{3, 304}_0 ∧ true) 
c  in CNF:
c    -b^{3, 304}_2 ∨  b^{3, 304}_1 ∨  b^{3, 304}_0 ∨ false 
c  in DIMACS:
-7301  7302  7303  0

c  3 does not represent an automaton state.
c    -(-b^{3, 304}_2 ∧  b^{3, 304}_1 ∧  b^{3, 304}_0 ∧ true) 
c  in CNF:
c     b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ false 
c  in DIMACS:
 7301 -7302 -7303  0
c  -3 does not represent an automaton state.
c    -( b^{3, 304}_2 ∧  b^{3, 304}_1 ∧  b^{3, 304}_0 ∧ true) 
c  in CNF:
c    -b^{3, 304}_2 ∨ -b^{3, 304}_1 ∨ -b^{3, 304}_0 ∨ false 
c  in DIMACS:
-7301 -7302 -7303  0

c i = 305
c  -2+1 --> -1
c    ( b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧  p_915) -> ( b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0)
c  in CNF:
c    -b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨  b^{3, 306}_2
c    -b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_1
c    -b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨  b^{3, 306}_0
c  in DIMACS:
-7304 -7305  7306 -915  7307 0
-7304 -7305  7306 -915 -7308 0
-7304 -7305  7306 -915  7309 0

c  -1+1 --> 0
c    ( b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0 ∧  p_915) -> (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧ -b^{3, 306}_0)
c  in CNF:
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_2
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_1
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_0
c  in DIMACS:
-7304  7305 -7306 -915 -7307 0
-7304  7305 -7306 -915 -7308 0
-7304  7305 -7306 -915 -7309 0

c  0+1 --> 1
c    (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧  p_915) -> (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0)
c  in CNF:
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_2
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_1
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨  b^{3, 306}_0
c  in DIMACS:
 7304  7305  7306 -915 -7307 0
 7304  7305  7306 -915 -7308 0
 7304  7305  7306 -915  7309 0

c  1+1 --> 2
c    (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0 ∧  p_915) -> (-b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0)
c  in CNF:
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_2
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨  b^{3, 306}_1
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ -p_915 ∨ -b^{3, 306}_0
c  in DIMACS:
 7304  7305 -7306 -915 -7307 0
 7304  7305 -7306 -915  7308 0
 7304  7305 -7306 -915 -7309 0

c  2+1 --> break 
c    (-b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧  p_915) -> break
c  in CNF:
c     b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 7304 -7305  7306 -915 1162 0


c  2-1 --> 1
c    (-b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧ -p_915) -> (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0)
c  in CNF:
c     b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_2
c     b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_1
c     b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨  b^{3, 306}_0
c  in DIMACS:
 7304 -7305  7306  915 -7307 0
 7304 -7305  7306  915 -7308 0
 7304 -7305  7306  915  7309 0

c  1-1 --> 0
c    (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0 ∧ -p_915) -> (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧ -b^{3, 306}_0)
c  in CNF:
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_2
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_1
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_0
c  in DIMACS:
 7304  7305 -7306  915 -7307 0
 7304  7305 -7306  915 -7308 0
 7304  7305 -7306  915 -7309 0

c  0-1 --> -1
c    (-b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧ -p_915) -> ( b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0)
c  in CNF:
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨  b^{3, 306}_2
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_1
c     b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨  b^{3, 306}_0
c  in DIMACS:
 7304  7305  7306  915  7307 0
 7304  7305  7306  915 -7308 0
 7304  7305  7306  915  7309 0

c  -1-1 --> -2
c    ( b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧  b^{3, 305}_0 ∧ -p_915) -> ( b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0)
c  in CNF:
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨  b^{3, 306}_2
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨  b^{3, 306}_1
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨  p_915 ∨ -b^{3, 306}_0
c  in DIMACS:
-7304  7305 -7306  915  7307 0
-7304  7305 -7306  915  7308 0
-7304  7305 -7306  915 -7309 0

c  -2-1 --> break 
c    ( b^{3, 305}_2 ∧  b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨  b^{3, 305}_0 ∨  p_915 ∨ break
c  in DIMACS:
-7304 -7305  7306  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 305}_2 ∧ -b^{3, 305}_1 ∧ -b^{3, 305}_0 ∧ true) 
c  in CNF:
c    -b^{3, 305}_2 ∨  b^{3, 305}_1 ∨  b^{3, 305}_0 ∨ false 
c  in DIMACS:
-7304  7305  7306  0

c  3 does not represent an automaton state.
c    -(-b^{3, 305}_2 ∧  b^{3, 305}_1 ∧  b^{3, 305}_0 ∧ true) 
c  in CNF:
c     b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ false 
c  in DIMACS:
 7304 -7305 -7306  0
c  -3 does not represent an automaton state.
c    -( b^{3, 305}_2 ∧  b^{3, 305}_1 ∧  b^{3, 305}_0 ∧ true) 
c  in CNF:
c    -b^{3, 305}_2 ∨ -b^{3, 305}_1 ∨ -b^{3, 305}_0 ∨ false 
c  in DIMACS:
-7304 -7305 -7306  0

c i = 306
c  -2+1 --> -1
c    ( b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧  p_918) -> ( b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0)
c  in CNF:
c    -b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨  b^{3, 307}_2
c    -b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_1
c    -b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨  b^{3, 307}_0
c  in DIMACS:
-7307 -7308  7309 -918  7310 0
-7307 -7308  7309 -918 -7311 0
-7307 -7308  7309 -918  7312 0

c  -1+1 --> 0
c    ( b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0 ∧  p_918) -> (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧ -b^{3, 307}_0)
c  in CNF:
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_2
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_1
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_0
c  in DIMACS:
-7307  7308 -7309 -918 -7310 0
-7307  7308 -7309 -918 -7311 0
-7307  7308 -7309 -918 -7312 0

c  0+1 --> 1
c    (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧  p_918) -> (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0)
c  in CNF:
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_2
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_1
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨  b^{3, 307}_0
c  in DIMACS:
 7307  7308  7309 -918 -7310 0
 7307  7308  7309 -918 -7311 0
 7307  7308  7309 -918  7312 0

c  1+1 --> 2
c    (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0 ∧  p_918) -> (-b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0)
c  in CNF:
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_2
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨  b^{3, 307}_1
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ -p_918 ∨ -b^{3, 307}_0
c  in DIMACS:
 7307  7308 -7309 -918 -7310 0
 7307  7308 -7309 -918  7311 0
 7307  7308 -7309 -918 -7312 0

c  2+1 --> break 
c    (-b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧  p_918) -> break
c  in CNF:
c     b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 7307 -7308  7309 -918 1162 0


c  2-1 --> 1
c    (-b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧ -p_918) -> (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0)
c  in CNF:
c     b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_2
c     b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_1
c     b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨  b^{3, 307}_0
c  in DIMACS:
 7307 -7308  7309  918 -7310 0
 7307 -7308  7309  918 -7311 0
 7307 -7308  7309  918  7312 0

c  1-1 --> 0
c    (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0 ∧ -p_918) -> (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧ -b^{3, 307}_0)
c  in CNF:
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_2
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_1
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_0
c  in DIMACS:
 7307  7308 -7309  918 -7310 0
 7307  7308 -7309  918 -7311 0
 7307  7308 -7309  918 -7312 0

c  0-1 --> -1
c    (-b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧ -p_918) -> ( b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0)
c  in CNF:
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨  b^{3, 307}_2
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_1
c     b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨  b^{3, 307}_0
c  in DIMACS:
 7307  7308  7309  918  7310 0
 7307  7308  7309  918 -7311 0
 7307  7308  7309  918  7312 0

c  -1-1 --> -2
c    ( b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧  b^{3, 306}_0 ∧ -p_918) -> ( b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0)
c  in CNF:
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨  b^{3, 307}_2
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨  b^{3, 307}_1
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨  p_918 ∨ -b^{3, 307}_0
c  in DIMACS:
-7307  7308 -7309  918  7310 0
-7307  7308 -7309  918  7311 0
-7307  7308 -7309  918 -7312 0

c  -2-1 --> break 
c    ( b^{3, 306}_2 ∧  b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨  b^{3, 306}_0 ∨  p_918 ∨ break
c  in DIMACS:
-7307 -7308  7309  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 306}_2 ∧ -b^{3, 306}_1 ∧ -b^{3, 306}_0 ∧ true) 
c  in CNF:
c    -b^{3, 306}_2 ∨  b^{3, 306}_1 ∨  b^{3, 306}_0 ∨ false 
c  in DIMACS:
-7307  7308  7309  0

c  3 does not represent an automaton state.
c    -(-b^{3, 306}_2 ∧  b^{3, 306}_1 ∧  b^{3, 306}_0 ∧ true) 
c  in CNF:
c     b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ false 
c  in DIMACS:
 7307 -7308 -7309  0
c  -3 does not represent an automaton state.
c    -( b^{3, 306}_2 ∧  b^{3, 306}_1 ∧  b^{3, 306}_0 ∧ true) 
c  in CNF:
c    -b^{3, 306}_2 ∨ -b^{3, 306}_1 ∨ -b^{3, 306}_0 ∨ false 
c  in DIMACS:
-7307 -7308 -7309  0

c i = 307
c  -2+1 --> -1
c    ( b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧  p_921) -> ( b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0)
c  in CNF:
c    -b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨  b^{3, 308}_2
c    -b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_1
c    -b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨  b^{3, 308}_0
c  in DIMACS:
-7310 -7311  7312 -921  7313 0
-7310 -7311  7312 -921 -7314 0
-7310 -7311  7312 -921  7315 0

c  -1+1 --> 0
c    ( b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0 ∧  p_921) -> (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧ -b^{3, 308}_0)
c  in CNF:
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_2
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_1
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_0
c  in DIMACS:
-7310  7311 -7312 -921 -7313 0
-7310  7311 -7312 -921 -7314 0
-7310  7311 -7312 -921 -7315 0

c  0+1 --> 1
c    (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧  p_921) -> (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0)
c  in CNF:
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_2
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_1
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨  b^{3, 308}_0
c  in DIMACS:
 7310  7311  7312 -921 -7313 0
 7310  7311  7312 -921 -7314 0
 7310  7311  7312 -921  7315 0

c  1+1 --> 2
c    (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0 ∧  p_921) -> (-b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0)
c  in CNF:
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_2
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨  b^{3, 308}_1
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ -p_921 ∨ -b^{3, 308}_0
c  in DIMACS:
 7310  7311 -7312 -921 -7313 0
 7310  7311 -7312 -921  7314 0
 7310  7311 -7312 -921 -7315 0

c  2+1 --> break 
c    (-b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧  p_921) -> break
c  in CNF:
c     b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ -p_921 ∨ break
c  in DIMACS:
 7310 -7311  7312 -921 1162 0


c  2-1 --> 1
c    (-b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧ -p_921) -> (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0)
c  in CNF:
c     b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_2
c     b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_1
c     b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨  b^{3, 308}_0
c  in DIMACS:
 7310 -7311  7312  921 -7313 0
 7310 -7311  7312  921 -7314 0
 7310 -7311  7312  921  7315 0

c  1-1 --> 0
c    (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0 ∧ -p_921) -> (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧ -b^{3, 308}_0)
c  in CNF:
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_2
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_1
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_0
c  in DIMACS:
 7310  7311 -7312  921 -7313 0
 7310  7311 -7312  921 -7314 0
 7310  7311 -7312  921 -7315 0

c  0-1 --> -1
c    (-b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧ -p_921) -> ( b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0)
c  in CNF:
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨  b^{3, 308}_2
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_1
c     b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨  b^{3, 308}_0
c  in DIMACS:
 7310  7311  7312  921  7313 0
 7310  7311  7312  921 -7314 0
 7310  7311  7312  921  7315 0

c  -1-1 --> -2
c    ( b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧  b^{3, 307}_0 ∧ -p_921) -> ( b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0)
c  in CNF:
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨  b^{3, 308}_2
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨  b^{3, 308}_1
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨  p_921 ∨ -b^{3, 308}_0
c  in DIMACS:
-7310  7311 -7312  921  7313 0
-7310  7311 -7312  921  7314 0
-7310  7311 -7312  921 -7315 0

c  -2-1 --> break 
c    ( b^{3, 307}_2 ∧  b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧ -p_921) -> break
c  in CNF:
c    -b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨  b^{3, 307}_0 ∨  p_921 ∨ break
c  in DIMACS:
-7310 -7311  7312  921 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 307}_2 ∧ -b^{3, 307}_1 ∧ -b^{3, 307}_0 ∧ true) 
c  in CNF:
c    -b^{3, 307}_2 ∨  b^{3, 307}_1 ∨  b^{3, 307}_0 ∨ false 
c  in DIMACS:
-7310  7311  7312  0

c  3 does not represent an automaton state.
c    -(-b^{3, 307}_2 ∧  b^{3, 307}_1 ∧  b^{3, 307}_0 ∧ true) 
c  in CNF:
c     b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ false 
c  in DIMACS:
 7310 -7311 -7312  0
c  -3 does not represent an automaton state.
c    -( b^{3, 307}_2 ∧  b^{3, 307}_1 ∧  b^{3, 307}_0 ∧ true) 
c  in CNF:
c    -b^{3, 307}_2 ∨ -b^{3, 307}_1 ∨ -b^{3, 307}_0 ∨ false 
c  in DIMACS:
-7310 -7311 -7312  0

c i = 308
c  -2+1 --> -1
c    ( b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧  p_924) -> ( b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0)
c  in CNF:
c    -b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨  b^{3, 309}_2
c    -b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_1
c    -b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨  b^{3, 309}_0
c  in DIMACS:
-7313 -7314  7315 -924  7316 0
-7313 -7314  7315 -924 -7317 0
-7313 -7314  7315 -924  7318 0

c  -1+1 --> 0
c    ( b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0 ∧  p_924) -> (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧ -b^{3, 309}_0)
c  in CNF:
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_2
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_1
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_0
c  in DIMACS:
-7313  7314 -7315 -924 -7316 0
-7313  7314 -7315 -924 -7317 0
-7313  7314 -7315 -924 -7318 0

c  0+1 --> 1
c    (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧  p_924) -> (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0)
c  in CNF:
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_2
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_1
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨  b^{3, 309}_0
c  in DIMACS:
 7313  7314  7315 -924 -7316 0
 7313  7314  7315 -924 -7317 0
 7313  7314  7315 -924  7318 0

c  1+1 --> 2
c    (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0 ∧  p_924) -> (-b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0)
c  in CNF:
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_2
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨  b^{3, 309}_1
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ -p_924 ∨ -b^{3, 309}_0
c  in DIMACS:
 7313  7314 -7315 -924 -7316 0
 7313  7314 -7315 -924  7317 0
 7313  7314 -7315 -924 -7318 0

c  2+1 --> break 
c    (-b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧  p_924) -> break
c  in CNF:
c     b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 7313 -7314  7315 -924 1162 0


c  2-1 --> 1
c    (-b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧ -p_924) -> (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0)
c  in CNF:
c     b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_2
c     b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_1
c     b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨  b^{3, 309}_0
c  in DIMACS:
 7313 -7314  7315  924 -7316 0
 7313 -7314  7315  924 -7317 0
 7313 -7314  7315  924  7318 0

c  1-1 --> 0
c    (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0 ∧ -p_924) -> (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧ -b^{3, 309}_0)
c  in CNF:
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_2
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_1
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_0
c  in DIMACS:
 7313  7314 -7315  924 -7316 0
 7313  7314 -7315  924 -7317 0
 7313  7314 -7315  924 -7318 0

c  0-1 --> -1
c    (-b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧ -p_924) -> ( b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0)
c  in CNF:
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨  b^{3, 309}_2
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_1
c     b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨  b^{3, 309}_0
c  in DIMACS:
 7313  7314  7315  924  7316 0
 7313  7314  7315  924 -7317 0
 7313  7314  7315  924  7318 0

c  -1-1 --> -2
c    ( b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧  b^{3, 308}_0 ∧ -p_924) -> ( b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0)
c  in CNF:
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨  b^{3, 309}_2
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨  b^{3, 309}_1
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨  p_924 ∨ -b^{3, 309}_0
c  in DIMACS:
-7313  7314 -7315  924  7316 0
-7313  7314 -7315  924  7317 0
-7313  7314 -7315  924 -7318 0

c  -2-1 --> break 
c    ( b^{3, 308}_2 ∧  b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨  b^{3, 308}_0 ∨  p_924 ∨ break
c  in DIMACS:
-7313 -7314  7315  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 308}_2 ∧ -b^{3, 308}_1 ∧ -b^{3, 308}_0 ∧ true) 
c  in CNF:
c    -b^{3, 308}_2 ∨  b^{3, 308}_1 ∨  b^{3, 308}_0 ∨ false 
c  in DIMACS:
-7313  7314  7315  0

c  3 does not represent an automaton state.
c    -(-b^{3, 308}_2 ∧  b^{3, 308}_1 ∧  b^{3, 308}_0 ∧ true) 
c  in CNF:
c     b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ false 
c  in DIMACS:
 7313 -7314 -7315  0
c  -3 does not represent an automaton state.
c    -( b^{3, 308}_2 ∧  b^{3, 308}_1 ∧  b^{3, 308}_0 ∧ true) 
c  in CNF:
c    -b^{3, 308}_2 ∨ -b^{3, 308}_1 ∨ -b^{3, 308}_0 ∨ false 
c  in DIMACS:
-7313 -7314 -7315  0

c i = 309
c  -2+1 --> -1
c    ( b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧  p_927) -> ( b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0)
c  in CNF:
c    -b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨  b^{3, 310}_2
c    -b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_1
c    -b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨  b^{3, 310}_0
c  in DIMACS:
-7316 -7317  7318 -927  7319 0
-7316 -7317  7318 -927 -7320 0
-7316 -7317  7318 -927  7321 0

c  -1+1 --> 0
c    ( b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0 ∧  p_927) -> (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧ -b^{3, 310}_0)
c  in CNF:
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_2
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_1
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_0
c  in DIMACS:
-7316  7317 -7318 -927 -7319 0
-7316  7317 -7318 -927 -7320 0
-7316  7317 -7318 -927 -7321 0

c  0+1 --> 1
c    (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧  p_927) -> (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0)
c  in CNF:
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_2
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_1
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨  b^{3, 310}_0
c  in DIMACS:
 7316  7317  7318 -927 -7319 0
 7316  7317  7318 -927 -7320 0
 7316  7317  7318 -927  7321 0

c  1+1 --> 2
c    (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0 ∧  p_927) -> (-b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0)
c  in CNF:
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_2
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨  b^{3, 310}_1
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ -p_927 ∨ -b^{3, 310}_0
c  in DIMACS:
 7316  7317 -7318 -927 -7319 0
 7316  7317 -7318 -927  7320 0
 7316  7317 -7318 -927 -7321 0

c  2+1 --> break 
c    (-b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧  p_927) -> break
c  in CNF:
c     b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ -p_927 ∨ break
c  in DIMACS:
 7316 -7317  7318 -927 1162 0


c  2-1 --> 1
c    (-b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧ -p_927) -> (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0)
c  in CNF:
c     b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_2
c     b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_1
c     b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨  b^{3, 310}_0
c  in DIMACS:
 7316 -7317  7318  927 -7319 0
 7316 -7317  7318  927 -7320 0
 7316 -7317  7318  927  7321 0

c  1-1 --> 0
c    (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0 ∧ -p_927) -> (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧ -b^{3, 310}_0)
c  in CNF:
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_2
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_1
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_0
c  in DIMACS:
 7316  7317 -7318  927 -7319 0
 7316  7317 -7318  927 -7320 0
 7316  7317 -7318  927 -7321 0

c  0-1 --> -1
c    (-b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧ -p_927) -> ( b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0)
c  in CNF:
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨  b^{3, 310}_2
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_1
c     b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨  b^{3, 310}_0
c  in DIMACS:
 7316  7317  7318  927  7319 0
 7316  7317  7318  927 -7320 0
 7316  7317  7318  927  7321 0

c  -1-1 --> -2
c    ( b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧  b^{3, 309}_0 ∧ -p_927) -> ( b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0)
c  in CNF:
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨  b^{3, 310}_2
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨  b^{3, 310}_1
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨  p_927 ∨ -b^{3, 310}_0
c  in DIMACS:
-7316  7317 -7318  927  7319 0
-7316  7317 -7318  927  7320 0
-7316  7317 -7318  927 -7321 0

c  -2-1 --> break 
c    ( b^{3, 309}_2 ∧  b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧ -p_927) -> break
c  in CNF:
c    -b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨  b^{3, 309}_0 ∨  p_927 ∨ break
c  in DIMACS:
-7316 -7317  7318  927 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 309}_2 ∧ -b^{3, 309}_1 ∧ -b^{3, 309}_0 ∧ true) 
c  in CNF:
c    -b^{3, 309}_2 ∨  b^{3, 309}_1 ∨  b^{3, 309}_0 ∨ false 
c  in DIMACS:
-7316  7317  7318  0

c  3 does not represent an automaton state.
c    -(-b^{3, 309}_2 ∧  b^{3, 309}_1 ∧  b^{3, 309}_0 ∧ true) 
c  in CNF:
c     b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ false 
c  in DIMACS:
 7316 -7317 -7318  0
c  -3 does not represent an automaton state.
c    -( b^{3, 309}_2 ∧  b^{3, 309}_1 ∧  b^{3, 309}_0 ∧ true) 
c  in CNF:
c    -b^{3, 309}_2 ∨ -b^{3, 309}_1 ∨ -b^{3, 309}_0 ∨ false 
c  in DIMACS:
-7316 -7317 -7318  0

c i = 310
c  -2+1 --> -1
c    ( b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧  p_930) -> ( b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0)
c  in CNF:
c    -b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨  b^{3, 311}_2
c    -b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_1
c    -b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨  b^{3, 311}_0
c  in DIMACS:
-7319 -7320  7321 -930  7322 0
-7319 -7320  7321 -930 -7323 0
-7319 -7320  7321 -930  7324 0

c  -1+1 --> 0
c    ( b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0 ∧  p_930) -> (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧ -b^{3, 311}_0)
c  in CNF:
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_2
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_1
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_0
c  in DIMACS:
-7319  7320 -7321 -930 -7322 0
-7319  7320 -7321 -930 -7323 0
-7319  7320 -7321 -930 -7324 0

c  0+1 --> 1
c    (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧  p_930) -> (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0)
c  in CNF:
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_2
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_1
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨  b^{3, 311}_0
c  in DIMACS:
 7319  7320  7321 -930 -7322 0
 7319  7320  7321 -930 -7323 0
 7319  7320  7321 -930  7324 0

c  1+1 --> 2
c    (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0 ∧  p_930) -> (-b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0)
c  in CNF:
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_2
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨  b^{3, 311}_1
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ -p_930 ∨ -b^{3, 311}_0
c  in DIMACS:
 7319  7320 -7321 -930 -7322 0
 7319  7320 -7321 -930  7323 0
 7319  7320 -7321 -930 -7324 0

c  2+1 --> break 
c    (-b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧  p_930) -> break
c  in CNF:
c     b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 7319 -7320  7321 -930 1162 0


c  2-1 --> 1
c    (-b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧ -p_930) -> (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0)
c  in CNF:
c     b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_2
c     b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_1
c     b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨  b^{3, 311}_0
c  in DIMACS:
 7319 -7320  7321  930 -7322 0
 7319 -7320  7321  930 -7323 0
 7319 -7320  7321  930  7324 0

c  1-1 --> 0
c    (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0 ∧ -p_930) -> (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧ -b^{3, 311}_0)
c  in CNF:
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_2
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_1
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_0
c  in DIMACS:
 7319  7320 -7321  930 -7322 0
 7319  7320 -7321  930 -7323 0
 7319  7320 -7321  930 -7324 0

c  0-1 --> -1
c    (-b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧ -p_930) -> ( b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0)
c  in CNF:
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨  b^{3, 311}_2
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_1
c     b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨  b^{3, 311}_0
c  in DIMACS:
 7319  7320  7321  930  7322 0
 7319  7320  7321  930 -7323 0
 7319  7320  7321  930  7324 0

c  -1-1 --> -2
c    ( b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧  b^{3, 310}_0 ∧ -p_930) -> ( b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0)
c  in CNF:
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨  b^{3, 311}_2
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨  b^{3, 311}_1
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨  p_930 ∨ -b^{3, 311}_0
c  in DIMACS:
-7319  7320 -7321  930  7322 0
-7319  7320 -7321  930  7323 0
-7319  7320 -7321  930 -7324 0

c  -2-1 --> break 
c    ( b^{3, 310}_2 ∧  b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨  b^{3, 310}_0 ∨  p_930 ∨ break
c  in DIMACS:
-7319 -7320  7321  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 310}_2 ∧ -b^{3, 310}_1 ∧ -b^{3, 310}_0 ∧ true) 
c  in CNF:
c    -b^{3, 310}_2 ∨  b^{3, 310}_1 ∨  b^{3, 310}_0 ∨ false 
c  in DIMACS:
-7319  7320  7321  0

c  3 does not represent an automaton state.
c    -(-b^{3, 310}_2 ∧  b^{3, 310}_1 ∧  b^{3, 310}_0 ∧ true) 
c  in CNF:
c     b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ false 
c  in DIMACS:
 7319 -7320 -7321  0
c  -3 does not represent an automaton state.
c    -( b^{3, 310}_2 ∧  b^{3, 310}_1 ∧  b^{3, 310}_0 ∧ true) 
c  in CNF:
c    -b^{3, 310}_2 ∨ -b^{3, 310}_1 ∨ -b^{3, 310}_0 ∨ false 
c  in DIMACS:
-7319 -7320 -7321  0

c i = 311
c  -2+1 --> -1
c    ( b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧  p_933) -> ( b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0)
c  in CNF:
c    -b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨  b^{3, 312}_2
c    -b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_1
c    -b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨  b^{3, 312}_0
c  in DIMACS:
-7322 -7323  7324 -933  7325 0
-7322 -7323  7324 -933 -7326 0
-7322 -7323  7324 -933  7327 0

c  -1+1 --> 0
c    ( b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0 ∧  p_933) -> (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧ -b^{3, 312}_0)
c  in CNF:
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_2
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_1
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_0
c  in DIMACS:
-7322  7323 -7324 -933 -7325 0
-7322  7323 -7324 -933 -7326 0
-7322  7323 -7324 -933 -7327 0

c  0+1 --> 1
c    (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧  p_933) -> (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0)
c  in CNF:
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_2
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_1
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨  b^{3, 312}_0
c  in DIMACS:
 7322  7323  7324 -933 -7325 0
 7322  7323  7324 -933 -7326 0
 7322  7323  7324 -933  7327 0

c  1+1 --> 2
c    (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0 ∧  p_933) -> (-b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0)
c  in CNF:
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_2
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨  b^{3, 312}_1
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ -p_933 ∨ -b^{3, 312}_0
c  in DIMACS:
 7322  7323 -7324 -933 -7325 0
 7322  7323 -7324 -933  7326 0
 7322  7323 -7324 -933 -7327 0

c  2+1 --> break 
c    (-b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧  p_933) -> break
c  in CNF:
c     b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ -p_933 ∨ break
c  in DIMACS:
 7322 -7323  7324 -933 1162 0


c  2-1 --> 1
c    (-b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧ -p_933) -> (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0)
c  in CNF:
c     b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_2
c     b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_1
c     b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨  b^{3, 312}_0
c  in DIMACS:
 7322 -7323  7324  933 -7325 0
 7322 -7323  7324  933 -7326 0
 7322 -7323  7324  933  7327 0

c  1-1 --> 0
c    (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0 ∧ -p_933) -> (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧ -b^{3, 312}_0)
c  in CNF:
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_2
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_1
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_0
c  in DIMACS:
 7322  7323 -7324  933 -7325 0
 7322  7323 -7324  933 -7326 0
 7322  7323 -7324  933 -7327 0

c  0-1 --> -1
c    (-b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧ -p_933) -> ( b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0)
c  in CNF:
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨  b^{3, 312}_2
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_1
c     b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨  b^{3, 312}_0
c  in DIMACS:
 7322  7323  7324  933  7325 0
 7322  7323  7324  933 -7326 0
 7322  7323  7324  933  7327 0

c  -1-1 --> -2
c    ( b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧  b^{3, 311}_0 ∧ -p_933) -> ( b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0)
c  in CNF:
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨  b^{3, 312}_2
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨  b^{3, 312}_1
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨  p_933 ∨ -b^{3, 312}_0
c  in DIMACS:
-7322  7323 -7324  933  7325 0
-7322  7323 -7324  933  7326 0
-7322  7323 -7324  933 -7327 0

c  -2-1 --> break 
c    ( b^{3, 311}_2 ∧  b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧ -p_933) -> break
c  in CNF:
c    -b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨  b^{3, 311}_0 ∨  p_933 ∨ break
c  in DIMACS:
-7322 -7323  7324  933 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 311}_2 ∧ -b^{3, 311}_1 ∧ -b^{3, 311}_0 ∧ true) 
c  in CNF:
c    -b^{3, 311}_2 ∨  b^{3, 311}_1 ∨  b^{3, 311}_0 ∨ false 
c  in DIMACS:
-7322  7323  7324  0

c  3 does not represent an automaton state.
c    -(-b^{3, 311}_2 ∧  b^{3, 311}_1 ∧  b^{3, 311}_0 ∧ true) 
c  in CNF:
c     b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ false 
c  in DIMACS:
 7322 -7323 -7324  0
c  -3 does not represent an automaton state.
c    -( b^{3, 311}_2 ∧  b^{3, 311}_1 ∧  b^{3, 311}_0 ∧ true) 
c  in CNF:
c    -b^{3, 311}_2 ∨ -b^{3, 311}_1 ∨ -b^{3, 311}_0 ∨ false 
c  in DIMACS:
-7322 -7323 -7324  0

c i = 312
c  -2+1 --> -1
c    ( b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧  p_936) -> ( b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0)
c  in CNF:
c    -b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨  b^{3, 313}_2
c    -b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_1
c    -b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨  b^{3, 313}_0
c  in DIMACS:
-7325 -7326  7327 -936  7328 0
-7325 -7326  7327 -936 -7329 0
-7325 -7326  7327 -936  7330 0

c  -1+1 --> 0
c    ( b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0 ∧  p_936) -> (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧ -b^{3, 313}_0)
c  in CNF:
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_2
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_1
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_0
c  in DIMACS:
-7325  7326 -7327 -936 -7328 0
-7325  7326 -7327 -936 -7329 0
-7325  7326 -7327 -936 -7330 0

c  0+1 --> 1
c    (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧  p_936) -> (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0)
c  in CNF:
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_2
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_1
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨  b^{3, 313}_0
c  in DIMACS:
 7325  7326  7327 -936 -7328 0
 7325  7326  7327 -936 -7329 0
 7325  7326  7327 -936  7330 0

c  1+1 --> 2
c    (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0 ∧  p_936) -> (-b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0)
c  in CNF:
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_2
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨  b^{3, 313}_1
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ -p_936 ∨ -b^{3, 313}_0
c  in DIMACS:
 7325  7326 -7327 -936 -7328 0
 7325  7326 -7327 -936  7329 0
 7325  7326 -7327 -936 -7330 0

c  2+1 --> break 
c    (-b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧  p_936) -> break
c  in CNF:
c     b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 7325 -7326  7327 -936 1162 0


c  2-1 --> 1
c    (-b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧ -p_936) -> (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0)
c  in CNF:
c     b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_2
c     b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_1
c     b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨  b^{3, 313}_0
c  in DIMACS:
 7325 -7326  7327  936 -7328 0
 7325 -7326  7327  936 -7329 0
 7325 -7326  7327  936  7330 0

c  1-1 --> 0
c    (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0 ∧ -p_936) -> (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧ -b^{3, 313}_0)
c  in CNF:
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_2
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_1
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_0
c  in DIMACS:
 7325  7326 -7327  936 -7328 0
 7325  7326 -7327  936 -7329 0
 7325  7326 -7327  936 -7330 0

c  0-1 --> -1
c    (-b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧ -p_936) -> ( b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0)
c  in CNF:
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨  b^{3, 313}_2
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_1
c     b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨  b^{3, 313}_0
c  in DIMACS:
 7325  7326  7327  936  7328 0
 7325  7326  7327  936 -7329 0
 7325  7326  7327  936  7330 0

c  -1-1 --> -2
c    ( b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧  b^{3, 312}_0 ∧ -p_936) -> ( b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0)
c  in CNF:
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨  b^{3, 313}_2
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨  b^{3, 313}_1
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨  p_936 ∨ -b^{3, 313}_0
c  in DIMACS:
-7325  7326 -7327  936  7328 0
-7325  7326 -7327  936  7329 0
-7325  7326 -7327  936 -7330 0

c  -2-1 --> break 
c    ( b^{3, 312}_2 ∧  b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨  b^{3, 312}_0 ∨  p_936 ∨ break
c  in DIMACS:
-7325 -7326  7327  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 312}_2 ∧ -b^{3, 312}_1 ∧ -b^{3, 312}_0 ∧ true) 
c  in CNF:
c    -b^{3, 312}_2 ∨  b^{3, 312}_1 ∨  b^{3, 312}_0 ∨ false 
c  in DIMACS:
-7325  7326  7327  0

c  3 does not represent an automaton state.
c    -(-b^{3, 312}_2 ∧  b^{3, 312}_1 ∧  b^{3, 312}_0 ∧ true) 
c  in CNF:
c     b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ false 
c  in DIMACS:
 7325 -7326 -7327  0
c  -3 does not represent an automaton state.
c    -( b^{3, 312}_2 ∧  b^{3, 312}_1 ∧  b^{3, 312}_0 ∧ true) 
c  in CNF:
c    -b^{3, 312}_2 ∨ -b^{3, 312}_1 ∨ -b^{3, 312}_0 ∨ false 
c  in DIMACS:
-7325 -7326 -7327  0

c i = 313
c  -2+1 --> -1
c    ( b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧  p_939) -> ( b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0)
c  in CNF:
c    -b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨  b^{3, 314}_2
c    -b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_1
c    -b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨  b^{3, 314}_0
c  in DIMACS:
-7328 -7329  7330 -939  7331 0
-7328 -7329  7330 -939 -7332 0
-7328 -7329  7330 -939  7333 0

c  -1+1 --> 0
c    ( b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0 ∧  p_939) -> (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧ -b^{3, 314}_0)
c  in CNF:
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_2
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_1
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_0
c  in DIMACS:
-7328  7329 -7330 -939 -7331 0
-7328  7329 -7330 -939 -7332 0
-7328  7329 -7330 -939 -7333 0

c  0+1 --> 1
c    (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧  p_939) -> (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0)
c  in CNF:
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_2
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_1
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨  b^{3, 314}_0
c  in DIMACS:
 7328  7329  7330 -939 -7331 0
 7328  7329  7330 -939 -7332 0
 7328  7329  7330 -939  7333 0

c  1+1 --> 2
c    (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0 ∧  p_939) -> (-b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0)
c  in CNF:
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_2
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨  b^{3, 314}_1
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ -p_939 ∨ -b^{3, 314}_0
c  in DIMACS:
 7328  7329 -7330 -939 -7331 0
 7328  7329 -7330 -939  7332 0
 7328  7329 -7330 -939 -7333 0

c  2+1 --> break 
c    (-b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧  p_939) -> break
c  in CNF:
c     b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ -p_939 ∨ break
c  in DIMACS:
 7328 -7329  7330 -939 1162 0


c  2-1 --> 1
c    (-b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧ -p_939) -> (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0)
c  in CNF:
c     b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_2
c     b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_1
c     b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨  b^{3, 314}_0
c  in DIMACS:
 7328 -7329  7330  939 -7331 0
 7328 -7329  7330  939 -7332 0
 7328 -7329  7330  939  7333 0

c  1-1 --> 0
c    (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0 ∧ -p_939) -> (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧ -b^{3, 314}_0)
c  in CNF:
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_2
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_1
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_0
c  in DIMACS:
 7328  7329 -7330  939 -7331 0
 7328  7329 -7330  939 -7332 0
 7328  7329 -7330  939 -7333 0

c  0-1 --> -1
c    (-b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧ -p_939) -> ( b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0)
c  in CNF:
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨  b^{3, 314}_2
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_1
c     b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨  b^{3, 314}_0
c  in DIMACS:
 7328  7329  7330  939  7331 0
 7328  7329  7330  939 -7332 0
 7328  7329  7330  939  7333 0

c  -1-1 --> -2
c    ( b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧  b^{3, 313}_0 ∧ -p_939) -> ( b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0)
c  in CNF:
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨  b^{3, 314}_2
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨  b^{3, 314}_1
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨  p_939 ∨ -b^{3, 314}_0
c  in DIMACS:
-7328  7329 -7330  939  7331 0
-7328  7329 -7330  939  7332 0
-7328  7329 -7330  939 -7333 0

c  -2-1 --> break 
c    ( b^{3, 313}_2 ∧  b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧ -p_939) -> break
c  in CNF:
c    -b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨  b^{3, 313}_0 ∨  p_939 ∨ break
c  in DIMACS:
-7328 -7329  7330  939 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 313}_2 ∧ -b^{3, 313}_1 ∧ -b^{3, 313}_0 ∧ true) 
c  in CNF:
c    -b^{3, 313}_2 ∨  b^{3, 313}_1 ∨  b^{3, 313}_0 ∨ false 
c  in DIMACS:
-7328  7329  7330  0

c  3 does not represent an automaton state.
c    -(-b^{3, 313}_2 ∧  b^{3, 313}_1 ∧  b^{3, 313}_0 ∧ true) 
c  in CNF:
c     b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ false 
c  in DIMACS:
 7328 -7329 -7330  0
c  -3 does not represent an automaton state.
c    -( b^{3, 313}_2 ∧  b^{3, 313}_1 ∧  b^{3, 313}_0 ∧ true) 
c  in CNF:
c    -b^{3, 313}_2 ∨ -b^{3, 313}_1 ∨ -b^{3, 313}_0 ∨ false 
c  in DIMACS:
-7328 -7329 -7330  0

c i = 314
c  -2+1 --> -1
c    ( b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧  p_942) -> ( b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0)
c  in CNF:
c    -b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨  b^{3, 315}_2
c    -b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_1
c    -b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨  b^{3, 315}_0
c  in DIMACS:
-7331 -7332  7333 -942  7334 0
-7331 -7332  7333 -942 -7335 0
-7331 -7332  7333 -942  7336 0

c  -1+1 --> 0
c    ( b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0 ∧  p_942) -> (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧ -b^{3, 315}_0)
c  in CNF:
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_2
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_1
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_0
c  in DIMACS:
-7331  7332 -7333 -942 -7334 0
-7331  7332 -7333 -942 -7335 0
-7331  7332 -7333 -942 -7336 0

c  0+1 --> 1
c    (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧  p_942) -> (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0)
c  in CNF:
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_2
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_1
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨  b^{3, 315}_0
c  in DIMACS:
 7331  7332  7333 -942 -7334 0
 7331  7332  7333 -942 -7335 0
 7331  7332  7333 -942  7336 0

c  1+1 --> 2
c    (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0 ∧  p_942) -> (-b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0)
c  in CNF:
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_2
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨  b^{3, 315}_1
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ -p_942 ∨ -b^{3, 315}_0
c  in DIMACS:
 7331  7332 -7333 -942 -7334 0
 7331  7332 -7333 -942  7335 0
 7331  7332 -7333 -942 -7336 0

c  2+1 --> break 
c    (-b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧  p_942) -> break
c  in CNF:
c     b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 7331 -7332  7333 -942 1162 0


c  2-1 --> 1
c    (-b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧ -p_942) -> (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0)
c  in CNF:
c     b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_2
c     b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_1
c     b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨  b^{3, 315}_0
c  in DIMACS:
 7331 -7332  7333  942 -7334 0
 7331 -7332  7333  942 -7335 0
 7331 -7332  7333  942  7336 0

c  1-1 --> 0
c    (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0 ∧ -p_942) -> (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧ -b^{3, 315}_0)
c  in CNF:
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_2
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_1
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_0
c  in DIMACS:
 7331  7332 -7333  942 -7334 0
 7331  7332 -7333  942 -7335 0
 7331  7332 -7333  942 -7336 0

c  0-1 --> -1
c    (-b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧ -p_942) -> ( b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0)
c  in CNF:
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨  b^{3, 315}_2
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_1
c     b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨  b^{3, 315}_0
c  in DIMACS:
 7331  7332  7333  942  7334 0
 7331  7332  7333  942 -7335 0
 7331  7332  7333  942  7336 0

c  -1-1 --> -2
c    ( b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧  b^{3, 314}_0 ∧ -p_942) -> ( b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0)
c  in CNF:
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨  b^{3, 315}_2
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨  b^{3, 315}_1
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨  p_942 ∨ -b^{3, 315}_0
c  in DIMACS:
-7331  7332 -7333  942  7334 0
-7331  7332 -7333  942  7335 0
-7331  7332 -7333  942 -7336 0

c  -2-1 --> break 
c    ( b^{3, 314}_2 ∧  b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨  b^{3, 314}_0 ∨  p_942 ∨ break
c  in DIMACS:
-7331 -7332  7333  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 314}_2 ∧ -b^{3, 314}_1 ∧ -b^{3, 314}_0 ∧ true) 
c  in CNF:
c    -b^{3, 314}_2 ∨  b^{3, 314}_1 ∨  b^{3, 314}_0 ∨ false 
c  in DIMACS:
-7331  7332  7333  0

c  3 does not represent an automaton state.
c    -(-b^{3, 314}_2 ∧  b^{3, 314}_1 ∧  b^{3, 314}_0 ∧ true) 
c  in CNF:
c     b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ false 
c  in DIMACS:
 7331 -7332 -7333  0
c  -3 does not represent an automaton state.
c    -( b^{3, 314}_2 ∧  b^{3, 314}_1 ∧  b^{3, 314}_0 ∧ true) 
c  in CNF:
c    -b^{3, 314}_2 ∨ -b^{3, 314}_1 ∨ -b^{3, 314}_0 ∨ false 
c  in DIMACS:
-7331 -7332 -7333  0

c i = 315
c  -2+1 --> -1
c    ( b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧  p_945) -> ( b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0)
c  in CNF:
c    -b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨  b^{3, 316}_2
c    -b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_1
c    -b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨  b^{3, 316}_0
c  in DIMACS:
-7334 -7335  7336 -945  7337 0
-7334 -7335  7336 -945 -7338 0
-7334 -7335  7336 -945  7339 0

c  -1+1 --> 0
c    ( b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0 ∧  p_945) -> (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧ -b^{3, 316}_0)
c  in CNF:
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_2
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_1
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_0
c  in DIMACS:
-7334  7335 -7336 -945 -7337 0
-7334  7335 -7336 -945 -7338 0
-7334  7335 -7336 -945 -7339 0

c  0+1 --> 1
c    (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧  p_945) -> (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0)
c  in CNF:
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_2
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_1
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨  b^{3, 316}_0
c  in DIMACS:
 7334  7335  7336 -945 -7337 0
 7334  7335  7336 -945 -7338 0
 7334  7335  7336 -945  7339 0

c  1+1 --> 2
c    (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0 ∧  p_945) -> (-b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0)
c  in CNF:
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_2
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨  b^{3, 316}_1
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ -p_945 ∨ -b^{3, 316}_0
c  in DIMACS:
 7334  7335 -7336 -945 -7337 0
 7334  7335 -7336 -945  7338 0
 7334  7335 -7336 -945 -7339 0

c  2+1 --> break 
c    (-b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧  p_945) -> break
c  in CNF:
c     b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 7334 -7335  7336 -945 1162 0


c  2-1 --> 1
c    (-b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧ -p_945) -> (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0)
c  in CNF:
c     b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_2
c     b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_1
c     b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨  b^{3, 316}_0
c  in DIMACS:
 7334 -7335  7336  945 -7337 0
 7334 -7335  7336  945 -7338 0
 7334 -7335  7336  945  7339 0

c  1-1 --> 0
c    (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0 ∧ -p_945) -> (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧ -b^{3, 316}_0)
c  in CNF:
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_2
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_1
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_0
c  in DIMACS:
 7334  7335 -7336  945 -7337 0
 7334  7335 -7336  945 -7338 0
 7334  7335 -7336  945 -7339 0

c  0-1 --> -1
c    (-b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧ -p_945) -> ( b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0)
c  in CNF:
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨  b^{3, 316}_2
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_1
c     b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨  b^{3, 316}_0
c  in DIMACS:
 7334  7335  7336  945  7337 0
 7334  7335  7336  945 -7338 0
 7334  7335  7336  945  7339 0

c  -1-1 --> -2
c    ( b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧  b^{3, 315}_0 ∧ -p_945) -> ( b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0)
c  in CNF:
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨  b^{3, 316}_2
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨  b^{3, 316}_1
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨  p_945 ∨ -b^{3, 316}_0
c  in DIMACS:
-7334  7335 -7336  945  7337 0
-7334  7335 -7336  945  7338 0
-7334  7335 -7336  945 -7339 0

c  -2-1 --> break 
c    ( b^{3, 315}_2 ∧  b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨  b^{3, 315}_0 ∨  p_945 ∨ break
c  in DIMACS:
-7334 -7335  7336  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 315}_2 ∧ -b^{3, 315}_1 ∧ -b^{3, 315}_0 ∧ true) 
c  in CNF:
c    -b^{3, 315}_2 ∨  b^{3, 315}_1 ∨  b^{3, 315}_0 ∨ false 
c  in DIMACS:
-7334  7335  7336  0

c  3 does not represent an automaton state.
c    -(-b^{3, 315}_2 ∧  b^{3, 315}_1 ∧  b^{3, 315}_0 ∧ true) 
c  in CNF:
c     b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ false 
c  in DIMACS:
 7334 -7335 -7336  0
c  -3 does not represent an automaton state.
c    -( b^{3, 315}_2 ∧  b^{3, 315}_1 ∧  b^{3, 315}_0 ∧ true) 
c  in CNF:
c    -b^{3, 315}_2 ∨ -b^{3, 315}_1 ∨ -b^{3, 315}_0 ∨ false 
c  in DIMACS:
-7334 -7335 -7336  0

c i = 316
c  -2+1 --> -1
c    ( b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧  p_948) -> ( b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0)
c  in CNF:
c    -b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨  b^{3, 317}_2
c    -b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_1
c    -b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨  b^{3, 317}_0
c  in DIMACS:
-7337 -7338  7339 -948  7340 0
-7337 -7338  7339 -948 -7341 0
-7337 -7338  7339 -948  7342 0

c  -1+1 --> 0
c    ( b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0 ∧  p_948) -> (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧ -b^{3, 317}_0)
c  in CNF:
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_2
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_1
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_0
c  in DIMACS:
-7337  7338 -7339 -948 -7340 0
-7337  7338 -7339 -948 -7341 0
-7337  7338 -7339 -948 -7342 0

c  0+1 --> 1
c    (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧  p_948) -> (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0)
c  in CNF:
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_2
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_1
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨  b^{3, 317}_0
c  in DIMACS:
 7337  7338  7339 -948 -7340 0
 7337  7338  7339 -948 -7341 0
 7337  7338  7339 -948  7342 0

c  1+1 --> 2
c    (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0 ∧  p_948) -> (-b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0)
c  in CNF:
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_2
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨  b^{3, 317}_1
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ -p_948 ∨ -b^{3, 317}_0
c  in DIMACS:
 7337  7338 -7339 -948 -7340 0
 7337  7338 -7339 -948  7341 0
 7337  7338 -7339 -948 -7342 0

c  2+1 --> break 
c    (-b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧  p_948) -> break
c  in CNF:
c     b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 7337 -7338  7339 -948 1162 0


c  2-1 --> 1
c    (-b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧ -p_948) -> (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0)
c  in CNF:
c     b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_2
c     b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_1
c     b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨  b^{3, 317}_0
c  in DIMACS:
 7337 -7338  7339  948 -7340 0
 7337 -7338  7339  948 -7341 0
 7337 -7338  7339  948  7342 0

c  1-1 --> 0
c    (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0 ∧ -p_948) -> (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧ -b^{3, 317}_0)
c  in CNF:
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_2
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_1
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_0
c  in DIMACS:
 7337  7338 -7339  948 -7340 0
 7337  7338 -7339  948 -7341 0
 7337  7338 -7339  948 -7342 0

c  0-1 --> -1
c    (-b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧ -p_948) -> ( b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0)
c  in CNF:
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨  b^{3, 317}_2
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_1
c     b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨  b^{3, 317}_0
c  in DIMACS:
 7337  7338  7339  948  7340 0
 7337  7338  7339  948 -7341 0
 7337  7338  7339  948  7342 0

c  -1-1 --> -2
c    ( b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧  b^{3, 316}_0 ∧ -p_948) -> ( b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0)
c  in CNF:
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨  b^{3, 317}_2
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨  b^{3, 317}_1
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨  p_948 ∨ -b^{3, 317}_0
c  in DIMACS:
-7337  7338 -7339  948  7340 0
-7337  7338 -7339  948  7341 0
-7337  7338 -7339  948 -7342 0

c  -2-1 --> break 
c    ( b^{3, 316}_2 ∧  b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨  b^{3, 316}_0 ∨  p_948 ∨ break
c  in DIMACS:
-7337 -7338  7339  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 316}_2 ∧ -b^{3, 316}_1 ∧ -b^{3, 316}_0 ∧ true) 
c  in CNF:
c    -b^{3, 316}_2 ∨  b^{3, 316}_1 ∨  b^{3, 316}_0 ∨ false 
c  in DIMACS:
-7337  7338  7339  0

c  3 does not represent an automaton state.
c    -(-b^{3, 316}_2 ∧  b^{3, 316}_1 ∧  b^{3, 316}_0 ∧ true) 
c  in CNF:
c     b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ false 
c  in DIMACS:
 7337 -7338 -7339  0
c  -3 does not represent an automaton state.
c    -( b^{3, 316}_2 ∧  b^{3, 316}_1 ∧  b^{3, 316}_0 ∧ true) 
c  in CNF:
c    -b^{3, 316}_2 ∨ -b^{3, 316}_1 ∨ -b^{3, 316}_0 ∨ false 
c  in DIMACS:
-7337 -7338 -7339  0

c i = 317
c  -2+1 --> -1
c    ( b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧  p_951) -> ( b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0)
c  in CNF:
c    -b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨  b^{3, 318}_2
c    -b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_1
c    -b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨  b^{3, 318}_0
c  in DIMACS:
-7340 -7341  7342 -951  7343 0
-7340 -7341  7342 -951 -7344 0
-7340 -7341  7342 -951  7345 0

c  -1+1 --> 0
c    ( b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0 ∧  p_951) -> (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧ -b^{3, 318}_0)
c  in CNF:
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_2
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_1
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_0
c  in DIMACS:
-7340  7341 -7342 -951 -7343 0
-7340  7341 -7342 -951 -7344 0
-7340  7341 -7342 -951 -7345 0

c  0+1 --> 1
c    (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧  p_951) -> (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0)
c  in CNF:
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_2
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_1
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨  b^{3, 318}_0
c  in DIMACS:
 7340  7341  7342 -951 -7343 0
 7340  7341  7342 -951 -7344 0
 7340  7341  7342 -951  7345 0

c  1+1 --> 2
c    (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0 ∧  p_951) -> (-b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0)
c  in CNF:
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_2
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨  b^{3, 318}_1
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ -p_951 ∨ -b^{3, 318}_0
c  in DIMACS:
 7340  7341 -7342 -951 -7343 0
 7340  7341 -7342 -951  7344 0
 7340  7341 -7342 -951 -7345 0

c  2+1 --> break 
c    (-b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧  p_951) -> break
c  in CNF:
c     b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ -p_951 ∨ break
c  in DIMACS:
 7340 -7341  7342 -951 1162 0


c  2-1 --> 1
c    (-b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧ -p_951) -> (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0)
c  in CNF:
c     b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_2
c     b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_1
c     b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨  b^{3, 318}_0
c  in DIMACS:
 7340 -7341  7342  951 -7343 0
 7340 -7341  7342  951 -7344 0
 7340 -7341  7342  951  7345 0

c  1-1 --> 0
c    (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0 ∧ -p_951) -> (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧ -b^{3, 318}_0)
c  in CNF:
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_2
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_1
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_0
c  in DIMACS:
 7340  7341 -7342  951 -7343 0
 7340  7341 -7342  951 -7344 0
 7340  7341 -7342  951 -7345 0

c  0-1 --> -1
c    (-b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧ -p_951) -> ( b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0)
c  in CNF:
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨  b^{3, 318}_2
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_1
c     b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨  b^{3, 318}_0
c  in DIMACS:
 7340  7341  7342  951  7343 0
 7340  7341  7342  951 -7344 0
 7340  7341  7342  951  7345 0

c  -1-1 --> -2
c    ( b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧  b^{3, 317}_0 ∧ -p_951) -> ( b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0)
c  in CNF:
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨  b^{3, 318}_2
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨  b^{3, 318}_1
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨  p_951 ∨ -b^{3, 318}_0
c  in DIMACS:
-7340  7341 -7342  951  7343 0
-7340  7341 -7342  951  7344 0
-7340  7341 -7342  951 -7345 0

c  -2-1 --> break 
c    ( b^{3, 317}_2 ∧  b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧ -p_951) -> break
c  in CNF:
c    -b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨  b^{3, 317}_0 ∨  p_951 ∨ break
c  in DIMACS:
-7340 -7341  7342  951 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 317}_2 ∧ -b^{3, 317}_1 ∧ -b^{3, 317}_0 ∧ true) 
c  in CNF:
c    -b^{3, 317}_2 ∨  b^{3, 317}_1 ∨  b^{3, 317}_0 ∨ false 
c  in DIMACS:
-7340  7341  7342  0

c  3 does not represent an automaton state.
c    -(-b^{3, 317}_2 ∧  b^{3, 317}_1 ∧  b^{3, 317}_0 ∧ true) 
c  in CNF:
c     b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ false 
c  in DIMACS:
 7340 -7341 -7342  0
c  -3 does not represent an automaton state.
c    -( b^{3, 317}_2 ∧  b^{3, 317}_1 ∧  b^{3, 317}_0 ∧ true) 
c  in CNF:
c    -b^{3, 317}_2 ∨ -b^{3, 317}_1 ∨ -b^{3, 317}_0 ∨ false 
c  in DIMACS:
-7340 -7341 -7342  0

c i = 318
c  -2+1 --> -1
c    ( b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧  p_954) -> ( b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0)
c  in CNF:
c    -b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨  b^{3, 319}_2
c    -b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_1
c    -b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨  b^{3, 319}_0
c  in DIMACS:
-7343 -7344  7345 -954  7346 0
-7343 -7344  7345 -954 -7347 0
-7343 -7344  7345 -954  7348 0

c  -1+1 --> 0
c    ( b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0 ∧  p_954) -> (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧ -b^{3, 319}_0)
c  in CNF:
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_2
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_1
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_0
c  in DIMACS:
-7343  7344 -7345 -954 -7346 0
-7343  7344 -7345 -954 -7347 0
-7343  7344 -7345 -954 -7348 0

c  0+1 --> 1
c    (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧  p_954) -> (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0)
c  in CNF:
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_2
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_1
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨  b^{3, 319}_0
c  in DIMACS:
 7343  7344  7345 -954 -7346 0
 7343  7344  7345 -954 -7347 0
 7343  7344  7345 -954  7348 0

c  1+1 --> 2
c    (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0 ∧  p_954) -> (-b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0)
c  in CNF:
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_2
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨  b^{3, 319}_1
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ -p_954 ∨ -b^{3, 319}_0
c  in DIMACS:
 7343  7344 -7345 -954 -7346 0
 7343  7344 -7345 -954  7347 0
 7343  7344 -7345 -954 -7348 0

c  2+1 --> break 
c    (-b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧  p_954) -> break
c  in CNF:
c     b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 7343 -7344  7345 -954 1162 0


c  2-1 --> 1
c    (-b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧ -p_954) -> (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0)
c  in CNF:
c     b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_2
c     b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_1
c     b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨  b^{3, 319}_0
c  in DIMACS:
 7343 -7344  7345  954 -7346 0
 7343 -7344  7345  954 -7347 0
 7343 -7344  7345  954  7348 0

c  1-1 --> 0
c    (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0 ∧ -p_954) -> (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧ -b^{3, 319}_0)
c  in CNF:
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_2
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_1
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_0
c  in DIMACS:
 7343  7344 -7345  954 -7346 0
 7343  7344 -7345  954 -7347 0
 7343  7344 -7345  954 -7348 0

c  0-1 --> -1
c    (-b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧ -p_954) -> ( b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0)
c  in CNF:
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨  b^{3, 319}_2
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_1
c     b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨  b^{3, 319}_0
c  in DIMACS:
 7343  7344  7345  954  7346 0
 7343  7344  7345  954 -7347 0
 7343  7344  7345  954  7348 0

c  -1-1 --> -2
c    ( b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧  b^{3, 318}_0 ∧ -p_954) -> ( b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0)
c  in CNF:
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨  b^{3, 319}_2
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨  b^{3, 319}_1
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨  p_954 ∨ -b^{3, 319}_0
c  in DIMACS:
-7343  7344 -7345  954  7346 0
-7343  7344 -7345  954  7347 0
-7343  7344 -7345  954 -7348 0

c  -2-1 --> break 
c    ( b^{3, 318}_2 ∧  b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨  b^{3, 318}_0 ∨  p_954 ∨ break
c  in DIMACS:
-7343 -7344  7345  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 318}_2 ∧ -b^{3, 318}_1 ∧ -b^{3, 318}_0 ∧ true) 
c  in CNF:
c    -b^{3, 318}_2 ∨  b^{3, 318}_1 ∨  b^{3, 318}_0 ∨ false 
c  in DIMACS:
-7343  7344  7345  0

c  3 does not represent an automaton state.
c    -(-b^{3, 318}_2 ∧  b^{3, 318}_1 ∧  b^{3, 318}_0 ∧ true) 
c  in CNF:
c     b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ false 
c  in DIMACS:
 7343 -7344 -7345  0
c  -3 does not represent an automaton state.
c    -( b^{3, 318}_2 ∧  b^{3, 318}_1 ∧  b^{3, 318}_0 ∧ true) 
c  in CNF:
c    -b^{3, 318}_2 ∨ -b^{3, 318}_1 ∨ -b^{3, 318}_0 ∨ false 
c  in DIMACS:
-7343 -7344 -7345  0

c i = 319
c  -2+1 --> -1
c    ( b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧  p_957) -> ( b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0)
c  in CNF:
c    -b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨  b^{3, 320}_2
c    -b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_1
c    -b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨  b^{3, 320}_0
c  in DIMACS:
-7346 -7347  7348 -957  7349 0
-7346 -7347  7348 -957 -7350 0
-7346 -7347  7348 -957  7351 0

c  -1+1 --> 0
c    ( b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0 ∧  p_957) -> (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧ -b^{3, 320}_0)
c  in CNF:
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_2
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_1
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_0
c  in DIMACS:
-7346  7347 -7348 -957 -7349 0
-7346  7347 -7348 -957 -7350 0
-7346  7347 -7348 -957 -7351 0

c  0+1 --> 1
c    (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧  p_957) -> (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0)
c  in CNF:
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_2
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_1
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨  b^{3, 320}_0
c  in DIMACS:
 7346  7347  7348 -957 -7349 0
 7346  7347  7348 -957 -7350 0
 7346  7347  7348 -957  7351 0

c  1+1 --> 2
c    (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0 ∧  p_957) -> (-b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0)
c  in CNF:
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_2
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨  b^{3, 320}_1
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ -p_957 ∨ -b^{3, 320}_0
c  in DIMACS:
 7346  7347 -7348 -957 -7349 0
 7346  7347 -7348 -957  7350 0
 7346  7347 -7348 -957 -7351 0

c  2+1 --> break 
c    (-b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧  p_957) -> break
c  in CNF:
c     b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 7346 -7347  7348 -957 1162 0


c  2-1 --> 1
c    (-b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧ -p_957) -> (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0)
c  in CNF:
c     b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_2
c     b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_1
c     b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨  b^{3, 320}_0
c  in DIMACS:
 7346 -7347  7348  957 -7349 0
 7346 -7347  7348  957 -7350 0
 7346 -7347  7348  957  7351 0

c  1-1 --> 0
c    (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0 ∧ -p_957) -> (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧ -b^{3, 320}_0)
c  in CNF:
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_2
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_1
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_0
c  in DIMACS:
 7346  7347 -7348  957 -7349 0
 7346  7347 -7348  957 -7350 0
 7346  7347 -7348  957 -7351 0

c  0-1 --> -1
c    (-b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧ -p_957) -> ( b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0)
c  in CNF:
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨  b^{3, 320}_2
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_1
c     b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨  b^{3, 320}_0
c  in DIMACS:
 7346  7347  7348  957  7349 0
 7346  7347  7348  957 -7350 0
 7346  7347  7348  957  7351 0

c  -1-1 --> -2
c    ( b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧  b^{3, 319}_0 ∧ -p_957) -> ( b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0)
c  in CNF:
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨  b^{3, 320}_2
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨  b^{3, 320}_1
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨  p_957 ∨ -b^{3, 320}_0
c  in DIMACS:
-7346  7347 -7348  957  7349 0
-7346  7347 -7348  957  7350 0
-7346  7347 -7348  957 -7351 0

c  -2-1 --> break 
c    ( b^{3, 319}_2 ∧  b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨  b^{3, 319}_0 ∨  p_957 ∨ break
c  in DIMACS:
-7346 -7347  7348  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 319}_2 ∧ -b^{3, 319}_1 ∧ -b^{3, 319}_0 ∧ true) 
c  in CNF:
c    -b^{3, 319}_2 ∨  b^{3, 319}_1 ∨  b^{3, 319}_0 ∨ false 
c  in DIMACS:
-7346  7347  7348  0

c  3 does not represent an automaton state.
c    -(-b^{3, 319}_2 ∧  b^{3, 319}_1 ∧  b^{3, 319}_0 ∧ true) 
c  in CNF:
c     b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ false 
c  in DIMACS:
 7346 -7347 -7348  0
c  -3 does not represent an automaton state.
c    -( b^{3, 319}_2 ∧  b^{3, 319}_1 ∧  b^{3, 319}_0 ∧ true) 
c  in CNF:
c    -b^{3, 319}_2 ∨ -b^{3, 319}_1 ∨ -b^{3, 319}_0 ∨ false 
c  in DIMACS:
-7346 -7347 -7348  0

c i = 320
c  -2+1 --> -1
c    ( b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧  p_960) -> ( b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0)
c  in CNF:
c    -b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨  b^{3, 321}_2
c    -b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_1
c    -b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨  b^{3, 321}_0
c  in DIMACS:
-7349 -7350  7351 -960  7352 0
-7349 -7350  7351 -960 -7353 0
-7349 -7350  7351 -960  7354 0

c  -1+1 --> 0
c    ( b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0 ∧  p_960) -> (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧ -b^{3, 321}_0)
c  in CNF:
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_2
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_1
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_0
c  in DIMACS:
-7349  7350 -7351 -960 -7352 0
-7349  7350 -7351 -960 -7353 0
-7349  7350 -7351 -960 -7354 0

c  0+1 --> 1
c    (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧  p_960) -> (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0)
c  in CNF:
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_2
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_1
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨  b^{3, 321}_0
c  in DIMACS:
 7349  7350  7351 -960 -7352 0
 7349  7350  7351 -960 -7353 0
 7349  7350  7351 -960  7354 0

c  1+1 --> 2
c    (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0 ∧  p_960) -> (-b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0)
c  in CNF:
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_2
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨  b^{3, 321}_1
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ -p_960 ∨ -b^{3, 321}_0
c  in DIMACS:
 7349  7350 -7351 -960 -7352 0
 7349  7350 -7351 -960  7353 0
 7349  7350 -7351 -960 -7354 0

c  2+1 --> break 
c    (-b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧  p_960) -> break
c  in CNF:
c     b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 7349 -7350  7351 -960 1162 0


c  2-1 --> 1
c    (-b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧ -p_960) -> (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0)
c  in CNF:
c     b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_2
c     b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_1
c     b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨  b^{3, 321}_0
c  in DIMACS:
 7349 -7350  7351  960 -7352 0
 7349 -7350  7351  960 -7353 0
 7349 -7350  7351  960  7354 0

c  1-1 --> 0
c    (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0 ∧ -p_960) -> (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧ -b^{3, 321}_0)
c  in CNF:
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_2
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_1
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_0
c  in DIMACS:
 7349  7350 -7351  960 -7352 0
 7349  7350 -7351  960 -7353 0
 7349  7350 -7351  960 -7354 0

c  0-1 --> -1
c    (-b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧ -p_960) -> ( b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0)
c  in CNF:
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨  b^{3, 321}_2
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_1
c     b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨  b^{3, 321}_0
c  in DIMACS:
 7349  7350  7351  960  7352 0
 7349  7350  7351  960 -7353 0
 7349  7350  7351  960  7354 0

c  -1-1 --> -2
c    ( b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧  b^{3, 320}_0 ∧ -p_960) -> ( b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0)
c  in CNF:
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨  b^{3, 321}_2
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨  b^{3, 321}_1
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨  p_960 ∨ -b^{3, 321}_0
c  in DIMACS:
-7349  7350 -7351  960  7352 0
-7349  7350 -7351  960  7353 0
-7349  7350 -7351  960 -7354 0

c  -2-1 --> break 
c    ( b^{3, 320}_2 ∧  b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨  b^{3, 320}_0 ∨  p_960 ∨ break
c  in DIMACS:
-7349 -7350  7351  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 320}_2 ∧ -b^{3, 320}_1 ∧ -b^{3, 320}_0 ∧ true) 
c  in CNF:
c    -b^{3, 320}_2 ∨  b^{3, 320}_1 ∨  b^{3, 320}_0 ∨ false 
c  in DIMACS:
-7349  7350  7351  0

c  3 does not represent an automaton state.
c    -(-b^{3, 320}_2 ∧  b^{3, 320}_1 ∧  b^{3, 320}_0 ∧ true) 
c  in CNF:
c     b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ false 
c  in DIMACS:
 7349 -7350 -7351  0
c  -3 does not represent an automaton state.
c    -( b^{3, 320}_2 ∧  b^{3, 320}_1 ∧  b^{3, 320}_0 ∧ true) 
c  in CNF:
c    -b^{3, 320}_2 ∨ -b^{3, 320}_1 ∨ -b^{3, 320}_0 ∨ false 
c  in DIMACS:
-7349 -7350 -7351  0

c i = 321
c  -2+1 --> -1
c    ( b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧  p_963) -> ( b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0)
c  in CNF:
c    -b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨  b^{3, 322}_2
c    -b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_1
c    -b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨  b^{3, 322}_0
c  in DIMACS:
-7352 -7353  7354 -963  7355 0
-7352 -7353  7354 -963 -7356 0
-7352 -7353  7354 -963  7357 0

c  -1+1 --> 0
c    ( b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0 ∧  p_963) -> (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧ -b^{3, 322}_0)
c  in CNF:
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_2
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_1
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_0
c  in DIMACS:
-7352  7353 -7354 -963 -7355 0
-7352  7353 -7354 -963 -7356 0
-7352  7353 -7354 -963 -7357 0

c  0+1 --> 1
c    (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧  p_963) -> (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0)
c  in CNF:
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_2
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_1
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨  b^{3, 322}_0
c  in DIMACS:
 7352  7353  7354 -963 -7355 0
 7352  7353  7354 -963 -7356 0
 7352  7353  7354 -963  7357 0

c  1+1 --> 2
c    (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0 ∧  p_963) -> (-b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0)
c  in CNF:
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_2
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨  b^{3, 322}_1
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ -p_963 ∨ -b^{3, 322}_0
c  in DIMACS:
 7352  7353 -7354 -963 -7355 0
 7352  7353 -7354 -963  7356 0
 7352  7353 -7354 -963 -7357 0

c  2+1 --> break 
c    (-b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧  p_963) -> break
c  in CNF:
c     b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ -p_963 ∨ break
c  in DIMACS:
 7352 -7353  7354 -963 1162 0


c  2-1 --> 1
c    (-b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧ -p_963) -> (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0)
c  in CNF:
c     b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_2
c     b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_1
c     b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨  b^{3, 322}_0
c  in DIMACS:
 7352 -7353  7354  963 -7355 0
 7352 -7353  7354  963 -7356 0
 7352 -7353  7354  963  7357 0

c  1-1 --> 0
c    (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0 ∧ -p_963) -> (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧ -b^{3, 322}_0)
c  in CNF:
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_2
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_1
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_0
c  in DIMACS:
 7352  7353 -7354  963 -7355 0
 7352  7353 -7354  963 -7356 0
 7352  7353 -7354  963 -7357 0

c  0-1 --> -1
c    (-b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧ -p_963) -> ( b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0)
c  in CNF:
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨  b^{3, 322}_2
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_1
c     b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨  b^{3, 322}_0
c  in DIMACS:
 7352  7353  7354  963  7355 0
 7352  7353  7354  963 -7356 0
 7352  7353  7354  963  7357 0

c  -1-1 --> -2
c    ( b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧  b^{3, 321}_0 ∧ -p_963) -> ( b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0)
c  in CNF:
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨  b^{3, 322}_2
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨  b^{3, 322}_1
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨  p_963 ∨ -b^{3, 322}_0
c  in DIMACS:
-7352  7353 -7354  963  7355 0
-7352  7353 -7354  963  7356 0
-7352  7353 -7354  963 -7357 0

c  -2-1 --> break 
c    ( b^{3, 321}_2 ∧  b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧ -p_963) -> break
c  in CNF:
c    -b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨  b^{3, 321}_0 ∨  p_963 ∨ break
c  in DIMACS:
-7352 -7353  7354  963 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 321}_2 ∧ -b^{3, 321}_1 ∧ -b^{3, 321}_0 ∧ true) 
c  in CNF:
c    -b^{3, 321}_2 ∨  b^{3, 321}_1 ∨  b^{3, 321}_0 ∨ false 
c  in DIMACS:
-7352  7353  7354  0

c  3 does not represent an automaton state.
c    -(-b^{3, 321}_2 ∧  b^{3, 321}_1 ∧  b^{3, 321}_0 ∧ true) 
c  in CNF:
c     b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ false 
c  in DIMACS:
 7352 -7353 -7354  0
c  -3 does not represent an automaton state.
c    -( b^{3, 321}_2 ∧  b^{3, 321}_1 ∧  b^{3, 321}_0 ∧ true) 
c  in CNF:
c    -b^{3, 321}_2 ∨ -b^{3, 321}_1 ∨ -b^{3, 321}_0 ∨ false 
c  in DIMACS:
-7352 -7353 -7354  0

c i = 322
c  -2+1 --> -1
c    ( b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧  p_966) -> ( b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0)
c  in CNF:
c    -b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨  b^{3, 323}_2
c    -b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_1
c    -b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨  b^{3, 323}_0
c  in DIMACS:
-7355 -7356  7357 -966  7358 0
-7355 -7356  7357 -966 -7359 0
-7355 -7356  7357 -966  7360 0

c  -1+1 --> 0
c    ( b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0 ∧  p_966) -> (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧ -b^{3, 323}_0)
c  in CNF:
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_2
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_1
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_0
c  in DIMACS:
-7355  7356 -7357 -966 -7358 0
-7355  7356 -7357 -966 -7359 0
-7355  7356 -7357 -966 -7360 0

c  0+1 --> 1
c    (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧  p_966) -> (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0)
c  in CNF:
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_2
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_1
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨  b^{3, 323}_0
c  in DIMACS:
 7355  7356  7357 -966 -7358 0
 7355  7356  7357 -966 -7359 0
 7355  7356  7357 -966  7360 0

c  1+1 --> 2
c    (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0 ∧  p_966) -> (-b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0)
c  in CNF:
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_2
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨  b^{3, 323}_1
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ -p_966 ∨ -b^{3, 323}_0
c  in DIMACS:
 7355  7356 -7357 -966 -7358 0
 7355  7356 -7357 -966  7359 0
 7355  7356 -7357 -966 -7360 0

c  2+1 --> break 
c    (-b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧  p_966) -> break
c  in CNF:
c     b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 7355 -7356  7357 -966 1162 0


c  2-1 --> 1
c    (-b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧ -p_966) -> (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0)
c  in CNF:
c     b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_2
c     b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_1
c     b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨  b^{3, 323}_0
c  in DIMACS:
 7355 -7356  7357  966 -7358 0
 7355 -7356  7357  966 -7359 0
 7355 -7356  7357  966  7360 0

c  1-1 --> 0
c    (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0 ∧ -p_966) -> (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧ -b^{3, 323}_0)
c  in CNF:
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_2
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_1
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_0
c  in DIMACS:
 7355  7356 -7357  966 -7358 0
 7355  7356 -7357  966 -7359 0
 7355  7356 -7357  966 -7360 0

c  0-1 --> -1
c    (-b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧ -p_966) -> ( b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0)
c  in CNF:
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨  b^{3, 323}_2
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_1
c     b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨  b^{3, 323}_0
c  in DIMACS:
 7355  7356  7357  966  7358 0
 7355  7356  7357  966 -7359 0
 7355  7356  7357  966  7360 0

c  -1-1 --> -2
c    ( b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧  b^{3, 322}_0 ∧ -p_966) -> ( b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0)
c  in CNF:
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨  b^{3, 323}_2
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨  b^{3, 323}_1
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨  p_966 ∨ -b^{3, 323}_0
c  in DIMACS:
-7355  7356 -7357  966  7358 0
-7355  7356 -7357  966  7359 0
-7355  7356 -7357  966 -7360 0

c  -2-1 --> break 
c    ( b^{3, 322}_2 ∧  b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨  b^{3, 322}_0 ∨  p_966 ∨ break
c  in DIMACS:
-7355 -7356  7357  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 322}_2 ∧ -b^{3, 322}_1 ∧ -b^{3, 322}_0 ∧ true) 
c  in CNF:
c    -b^{3, 322}_2 ∨  b^{3, 322}_1 ∨  b^{3, 322}_0 ∨ false 
c  in DIMACS:
-7355  7356  7357  0

c  3 does not represent an automaton state.
c    -(-b^{3, 322}_2 ∧  b^{3, 322}_1 ∧  b^{3, 322}_0 ∧ true) 
c  in CNF:
c     b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ false 
c  in DIMACS:
 7355 -7356 -7357  0
c  -3 does not represent an automaton state.
c    -( b^{3, 322}_2 ∧  b^{3, 322}_1 ∧  b^{3, 322}_0 ∧ true) 
c  in CNF:
c    -b^{3, 322}_2 ∨ -b^{3, 322}_1 ∨ -b^{3, 322}_0 ∨ false 
c  in DIMACS:
-7355 -7356 -7357  0

c i = 323
c  -2+1 --> -1
c    ( b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧  p_969) -> ( b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0)
c  in CNF:
c    -b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨  b^{3, 324}_2
c    -b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_1
c    -b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨  b^{3, 324}_0
c  in DIMACS:
-7358 -7359  7360 -969  7361 0
-7358 -7359  7360 -969 -7362 0
-7358 -7359  7360 -969  7363 0

c  -1+1 --> 0
c    ( b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0 ∧  p_969) -> (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧ -b^{3, 324}_0)
c  in CNF:
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_2
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_1
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_0
c  in DIMACS:
-7358  7359 -7360 -969 -7361 0
-7358  7359 -7360 -969 -7362 0
-7358  7359 -7360 -969 -7363 0

c  0+1 --> 1
c    (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧  p_969) -> (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0)
c  in CNF:
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_2
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_1
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨  b^{3, 324}_0
c  in DIMACS:
 7358  7359  7360 -969 -7361 0
 7358  7359  7360 -969 -7362 0
 7358  7359  7360 -969  7363 0

c  1+1 --> 2
c    (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0 ∧  p_969) -> (-b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0)
c  in CNF:
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_2
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨  b^{3, 324}_1
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ -p_969 ∨ -b^{3, 324}_0
c  in DIMACS:
 7358  7359 -7360 -969 -7361 0
 7358  7359 -7360 -969  7362 0
 7358  7359 -7360 -969 -7363 0

c  2+1 --> break 
c    (-b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧  p_969) -> break
c  in CNF:
c     b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 7358 -7359  7360 -969 1162 0


c  2-1 --> 1
c    (-b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧ -p_969) -> (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0)
c  in CNF:
c     b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_2
c     b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_1
c     b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨  b^{3, 324}_0
c  in DIMACS:
 7358 -7359  7360  969 -7361 0
 7358 -7359  7360  969 -7362 0
 7358 -7359  7360  969  7363 0

c  1-1 --> 0
c    (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0 ∧ -p_969) -> (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧ -b^{3, 324}_0)
c  in CNF:
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_2
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_1
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_0
c  in DIMACS:
 7358  7359 -7360  969 -7361 0
 7358  7359 -7360  969 -7362 0
 7358  7359 -7360  969 -7363 0

c  0-1 --> -1
c    (-b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧ -p_969) -> ( b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0)
c  in CNF:
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨  b^{3, 324}_2
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_1
c     b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨  b^{3, 324}_0
c  in DIMACS:
 7358  7359  7360  969  7361 0
 7358  7359  7360  969 -7362 0
 7358  7359  7360  969  7363 0

c  -1-1 --> -2
c    ( b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧  b^{3, 323}_0 ∧ -p_969) -> ( b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0)
c  in CNF:
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨  b^{3, 324}_2
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨  b^{3, 324}_1
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨  p_969 ∨ -b^{3, 324}_0
c  in DIMACS:
-7358  7359 -7360  969  7361 0
-7358  7359 -7360  969  7362 0
-7358  7359 -7360  969 -7363 0

c  -2-1 --> break 
c    ( b^{3, 323}_2 ∧  b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨  b^{3, 323}_0 ∨  p_969 ∨ break
c  in DIMACS:
-7358 -7359  7360  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 323}_2 ∧ -b^{3, 323}_1 ∧ -b^{3, 323}_0 ∧ true) 
c  in CNF:
c    -b^{3, 323}_2 ∨  b^{3, 323}_1 ∨  b^{3, 323}_0 ∨ false 
c  in DIMACS:
-7358  7359  7360  0

c  3 does not represent an automaton state.
c    -(-b^{3, 323}_2 ∧  b^{3, 323}_1 ∧  b^{3, 323}_0 ∧ true) 
c  in CNF:
c     b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ false 
c  in DIMACS:
 7358 -7359 -7360  0
c  -3 does not represent an automaton state.
c    -( b^{3, 323}_2 ∧  b^{3, 323}_1 ∧  b^{3, 323}_0 ∧ true) 
c  in CNF:
c    -b^{3, 323}_2 ∨ -b^{3, 323}_1 ∨ -b^{3, 323}_0 ∨ false 
c  in DIMACS:
-7358 -7359 -7360  0

c i = 324
c  -2+1 --> -1
c    ( b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧  p_972) -> ( b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0)
c  in CNF:
c    -b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨  b^{3, 325}_2
c    -b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_1
c    -b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨  b^{3, 325}_0
c  in DIMACS:
-7361 -7362  7363 -972  7364 0
-7361 -7362  7363 -972 -7365 0
-7361 -7362  7363 -972  7366 0

c  -1+1 --> 0
c    ( b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0 ∧  p_972) -> (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧ -b^{3, 325}_0)
c  in CNF:
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_2
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_1
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_0
c  in DIMACS:
-7361  7362 -7363 -972 -7364 0
-7361  7362 -7363 -972 -7365 0
-7361  7362 -7363 -972 -7366 0

c  0+1 --> 1
c    (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧  p_972) -> (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0)
c  in CNF:
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_2
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_1
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨  b^{3, 325}_0
c  in DIMACS:
 7361  7362  7363 -972 -7364 0
 7361  7362  7363 -972 -7365 0
 7361  7362  7363 -972  7366 0

c  1+1 --> 2
c    (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0 ∧  p_972) -> (-b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0)
c  in CNF:
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_2
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨  b^{3, 325}_1
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ -p_972 ∨ -b^{3, 325}_0
c  in DIMACS:
 7361  7362 -7363 -972 -7364 0
 7361  7362 -7363 -972  7365 0
 7361  7362 -7363 -972 -7366 0

c  2+1 --> break 
c    (-b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧  p_972) -> break
c  in CNF:
c     b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 7361 -7362  7363 -972 1162 0


c  2-1 --> 1
c    (-b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧ -p_972) -> (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0)
c  in CNF:
c     b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_2
c     b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_1
c     b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨  b^{3, 325}_0
c  in DIMACS:
 7361 -7362  7363  972 -7364 0
 7361 -7362  7363  972 -7365 0
 7361 -7362  7363  972  7366 0

c  1-1 --> 0
c    (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0 ∧ -p_972) -> (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧ -b^{3, 325}_0)
c  in CNF:
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_2
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_1
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_0
c  in DIMACS:
 7361  7362 -7363  972 -7364 0
 7361  7362 -7363  972 -7365 0
 7361  7362 -7363  972 -7366 0

c  0-1 --> -1
c    (-b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧ -p_972) -> ( b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0)
c  in CNF:
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨  b^{3, 325}_2
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_1
c     b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨  b^{3, 325}_0
c  in DIMACS:
 7361  7362  7363  972  7364 0
 7361  7362  7363  972 -7365 0
 7361  7362  7363  972  7366 0

c  -1-1 --> -2
c    ( b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧  b^{3, 324}_0 ∧ -p_972) -> ( b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0)
c  in CNF:
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨  b^{3, 325}_2
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨  b^{3, 325}_1
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨  p_972 ∨ -b^{3, 325}_0
c  in DIMACS:
-7361  7362 -7363  972  7364 0
-7361  7362 -7363  972  7365 0
-7361  7362 -7363  972 -7366 0

c  -2-1 --> break 
c    ( b^{3, 324}_2 ∧  b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨  b^{3, 324}_0 ∨  p_972 ∨ break
c  in DIMACS:
-7361 -7362  7363  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 324}_2 ∧ -b^{3, 324}_1 ∧ -b^{3, 324}_0 ∧ true) 
c  in CNF:
c    -b^{3, 324}_2 ∨  b^{3, 324}_1 ∨  b^{3, 324}_0 ∨ false 
c  in DIMACS:
-7361  7362  7363  0

c  3 does not represent an automaton state.
c    -(-b^{3, 324}_2 ∧  b^{3, 324}_1 ∧  b^{3, 324}_0 ∧ true) 
c  in CNF:
c     b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ false 
c  in DIMACS:
 7361 -7362 -7363  0
c  -3 does not represent an automaton state.
c    -( b^{3, 324}_2 ∧  b^{3, 324}_1 ∧  b^{3, 324}_0 ∧ true) 
c  in CNF:
c    -b^{3, 324}_2 ∨ -b^{3, 324}_1 ∨ -b^{3, 324}_0 ∨ false 
c  in DIMACS:
-7361 -7362 -7363  0

c i = 325
c  -2+1 --> -1
c    ( b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧  p_975) -> ( b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0)
c  in CNF:
c    -b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨  b^{3, 326}_2
c    -b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_1
c    -b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨  b^{3, 326}_0
c  in DIMACS:
-7364 -7365  7366 -975  7367 0
-7364 -7365  7366 -975 -7368 0
-7364 -7365  7366 -975  7369 0

c  -1+1 --> 0
c    ( b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0 ∧  p_975) -> (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧ -b^{3, 326}_0)
c  in CNF:
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_2
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_1
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_0
c  in DIMACS:
-7364  7365 -7366 -975 -7367 0
-7364  7365 -7366 -975 -7368 0
-7364  7365 -7366 -975 -7369 0

c  0+1 --> 1
c    (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧  p_975) -> (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0)
c  in CNF:
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_2
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_1
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨  b^{3, 326}_0
c  in DIMACS:
 7364  7365  7366 -975 -7367 0
 7364  7365  7366 -975 -7368 0
 7364  7365  7366 -975  7369 0

c  1+1 --> 2
c    (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0 ∧  p_975) -> (-b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0)
c  in CNF:
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_2
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨  b^{3, 326}_1
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ -p_975 ∨ -b^{3, 326}_0
c  in DIMACS:
 7364  7365 -7366 -975 -7367 0
 7364  7365 -7366 -975  7368 0
 7364  7365 -7366 -975 -7369 0

c  2+1 --> break 
c    (-b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧  p_975) -> break
c  in CNF:
c     b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 7364 -7365  7366 -975 1162 0


c  2-1 --> 1
c    (-b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧ -p_975) -> (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0)
c  in CNF:
c     b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_2
c     b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_1
c     b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨  b^{3, 326}_0
c  in DIMACS:
 7364 -7365  7366  975 -7367 0
 7364 -7365  7366  975 -7368 0
 7364 -7365  7366  975  7369 0

c  1-1 --> 0
c    (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0 ∧ -p_975) -> (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧ -b^{3, 326}_0)
c  in CNF:
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_2
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_1
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_0
c  in DIMACS:
 7364  7365 -7366  975 -7367 0
 7364  7365 -7366  975 -7368 0
 7364  7365 -7366  975 -7369 0

c  0-1 --> -1
c    (-b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧ -p_975) -> ( b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0)
c  in CNF:
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨  b^{3, 326}_2
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_1
c     b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨  b^{3, 326}_0
c  in DIMACS:
 7364  7365  7366  975  7367 0
 7364  7365  7366  975 -7368 0
 7364  7365  7366  975  7369 0

c  -1-1 --> -2
c    ( b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧  b^{3, 325}_0 ∧ -p_975) -> ( b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0)
c  in CNF:
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨  b^{3, 326}_2
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨  b^{3, 326}_1
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨  p_975 ∨ -b^{3, 326}_0
c  in DIMACS:
-7364  7365 -7366  975  7367 0
-7364  7365 -7366  975  7368 0
-7364  7365 -7366  975 -7369 0

c  -2-1 --> break 
c    ( b^{3, 325}_2 ∧  b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨  b^{3, 325}_0 ∨  p_975 ∨ break
c  in DIMACS:
-7364 -7365  7366  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 325}_2 ∧ -b^{3, 325}_1 ∧ -b^{3, 325}_0 ∧ true) 
c  in CNF:
c    -b^{3, 325}_2 ∨  b^{3, 325}_1 ∨  b^{3, 325}_0 ∨ false 
c  in DIMACS:
-7364  7365  7366  0

c  3 does not represent an automaton state.
c    -(-b^{3, 325}_2 ∧  b^{3, 325}_1 ∧  b^{3, 325}_0 ∧ true) 
c  in CNF:
c     b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ false 
c  in DIMACS:
 7364 -7365 -7366  0
c  -3 does not represent an automaton state.
c    -( b^{3, 325}_2 ∧  b^{3, 325}_1 ∧  b^{3, 325}_0 ∧ true) 
c  in CNF:
c    -b^{3, 325}_2 ∨ -b^{3, 325}_1 ∨ -b^{3, 325}_0 ∨ false 
c  in DIMACS:
-7364 -7365 -7366  0

c i = 326
c  -2+1 --> -1
c    ( b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧  p_978) -> ( b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0)
c  in CNF:
c    -b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨  b^{3, 327}_2
c    -b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_1
c    -b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨  b^{3, 327}_0
c  in DIMACS:
-7367 -7368  7369 -978  7370 0
-7367 -7368  7369 -978 -7371 0
-7367 -7368  7369 -978  7372 0

c  -1+1 --> 0
c    ( b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0 ∧  p_978) -> (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧ -b^{3, 327}_0)
c  in CNF:
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_2
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_1
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_0
c  in DIMACS:
-7367  7368 -7369 -978 -7370 0
-7367  7368 -7369 -978 -7371 0
-7367  7368 -7369 -978 -7372 0

c  0+1 --> 1
c    (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧  p_978) -> (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0)
c  in CNF:
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_2
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_1
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨  b^{3, 327}_0
c  in DIMACS:
 7367  7368  7369 -978 -7370 0
 7367  7368  7369 -978 -7371 0
 7367  7368  7369 -978  7372 0

c  1+1 --> 2
c    (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0 ∧  p_978) -> (-b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0)
c  in CNF:
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_2
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨  b^{3, 327}_1
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ -p_978 ∨ -b^{3, 327}_0
c  in DIMACS:
 7367  7368 -7369 -978 -7370 0
 7367  7368 -7369 -978  7371 0
 7367  7368 -7369 -978 -7372 0

c  2+1 --> break 
c    (-b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧  p_978) -> break
c  in CNF:
c     b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 7367 -7368  7369 -978 1162 0


c  2-1 --> 1
c    (-b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧ -p_978) -> (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0)
c  in CNF:
c     b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_2
c     b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_1
c     b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨  b^{3, 327}_0
c  in DIMACS:
 7367 -7368  7369  978 -7370 0
 7367 -7368  7369  978 -7371 0
 7367 -7368  7369  978  7372 0

c  1-1 --> 0
c    (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0 ∧ -p_978) -> (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧ -b^{3, 327}_0)
c  in CNF:
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_2
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_1
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_0
c  in DIMACS:
 7367  7368 -7369  978 -7370 0
 7367  7368 -7369  978 -7371 0
 7367  7368 -7369  978 -7372 0

c  0-1 --> -1
c    (-b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧ -p_978) -> ( b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0)
c  in CNF:
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨  b^{3, 327}_2
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_1
c     b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨  b^{3, 327}_0
c  in DIMACS:
 7367  7368  7369  978  7370 0
 7367  7368  7369  978 -7371 0
 7367  7368  7369  978  7372 0

c  -1-1 --> -2
c    ( b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧  b^{3, 326}_0 ∧ -p_978) -> ( b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0)
c  in CNF:
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨  b^{3, 327}_2
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨  b^{3, 327}_1
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨  p_978 ∨ -b^{3, 327}_0
c  in DIMACS:
-7367  7368 -7369  978  7370 0
-7367  7368 -7369  978  7371 0
-7367  7368 -7369  978 -7372 0

c  -2-1 --> break 
c    ( b^{3, 326}_2 ∧  b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨  b^{3, 326}_0 ∨  p_978 ∨ break
c  in DIMACS:
-7367 -7368  7369  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 326}_2 ∧ -b^{3, 326}_1 ∧ -b^{3, 326}_0 ∧ true) 
c  in CNF:
c    -b^{3, 326}_2 ∨  b^{3, 326}_1 ∨  b^{3, 326}_0 ∨ false 
c  in DIMACS:
-7367  7368  7369  0

c  3 does not represent an automaton state.
c    -(-b^{3, 326}_2 ∧  b^{3, 326}_1 ∧  b^{3, 326}_0 ∧ true) 
c  in CNF:
c     b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ false 
c  in DIMACS:
 7367 -7368 -7369  0
c  -3 does not represent an automaton state.
c    -( b^{3, 326}_2 ∧  b^{3, 326}_1 ∧  b^{3, 326}_0 ∧ true) 
c  in CNF:
c    -b^{3, 326}_2 ∨ -b^{3, 326}_1 ∨ -b^{3, 326}_0 ∨ false 
c  in DIMACS:
-7367 -7368 -7369  0

c i = 327
c  -2+1 --> -1
c    ( b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧  p_981) -> ( b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0)
c  in CNF:
c    -b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨  b^{3, 328}_2
c    -b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_1
c    -b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨  b^{3, 328}_0
c  in DIMACS:
-7370 -7371  7372 -981  7373 0
-7370 -7371  7372 -981 -7374 0
-7370 -7371  7372 -981  7375 0

c  -1+1 --> 0
c    ( b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0 ∧  p_981) -> (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧ -b^{3, 328}_0)
c  in CNF:
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_2
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_1
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_0
c  in DIMACS:
-7370  7371 -7372 -981 -7373 0
-7370  7371 -7372 -981 -7374 0
-7370  7371 -7372 -981 -7375 0

c  0+1 --> 1
c    (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧  p_981) -> (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0)
c  in CNF:
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_2
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_1
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨  b^{3, 328}_0
c  in DIMACS:
 7370  7371  7372 -981 -7373 0
 7370  7371  7372 -981 -7374 0
 7370  7371  7372 -981  7375 0

c  1+1 --> 2
c    (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0 ∧  p_981) -> (-b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0)
c  in CNF:
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_2
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨  b^{3, 328}_1
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ -p_981 ∨ -b^{3, 328}_0
c  in DIMACS:
 7370  7371 -7372 -981 -7373 0
 7370  7371 -7372 -981  7374 0
 7370  7371 -7372 -981 -7375 0

c  2+1 --> break 
c    (-b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧  p_981) -> break
c  in CNF:
c     b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ -p_981 ∨ break
c  in DIMACS:
 7370 -7371  7372 -981 1162 0


c  2-1 --> 1
c    (-b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧ -p_981) -> (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0)
c  in CNF:
c     b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_2
c     b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_1
c     b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨  b^{3, 328}_0
c  in DIMACS:
 7370 -7371  7372  981 -7373 0
 7370 -7371  7372  981 -7374 0
 7370 -7371  7372  981  7375 0

c  1-1 --> 0
c    (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0 ∧ -p_981) -> (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧ -b^{3, 328}_0)
c  in CNF:
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_2
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_1
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_0
c  in DIMACS:
 7370  7371 -7372  981 -7373 0
 7370  7371 -7372  981 -7374 0
 7370  7371 -7372  981 -7375 0

c  0-1 --> -1
c    (-b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧ -p_981) -> ( b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0)
c  in CNF:
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨  b^{3, 328}_2
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_1
c     b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨  b^{3, 328}_0
c  in DIMACS:
 7370  7371  7372  981  7373 0
 7370  7371  7372  981 -7374 0
 7370  7371  7372  981  7375 0

c  -1-1 --> -2
c    ( b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧  b^{3, 327}_0 ∧ -p_981) -> ( b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0)
c  in CNF:
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨  b^{3, 328}_2
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨  b^{3, 328}_1
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨  p_981 ∨ -b^{3, 328}_0
c  in DIMACS:
-7370  7371 -7372  981  7373 0
-7370  7371 -7372  981  7374 0
-7370  7371 -7372  981 -7375 0

c  -2-1 --> break 
c    ( b^{3, 327}_2 ∧  b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧ -p_981) -> break
c  in CNF:
c    -b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨  b^{3, 327}_0 ∨  p_981 ∨ break
c  in DIMACS:
-7370 -7371  7372  981 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 327}_2 ∧ -b^{3, 327}_1 ∧ -b^{3, 327}_0 ∧ true) 
c  in CNF:
c    -b^{3, 327}_2 ∨  b^{3, 327}_1 ∨  b^{3, 327}_0 ∨ false 
c  in DIMACS:
-7370  7371  7372  0

c  3 does not represent an automaton state.
c    -(-b^{3, 327}_2 ∧  b^{3, 327}_1 ∧  b^{3, 327}_0 ∧ true) 
c  in CNF:
c     b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ false 
c  in DIMACS:
 7370 -7371 -7372  0
c  -3 does not represent an automaton state.
c    -( b^{3, 327}_2 ∧  b^{3, 327}_1 ∧  b^{3, 327}_0 ∧ true) 
c  in CNF:
c    -b^{3, 327}_2 ∨ -b^{3, 327}_1 ∨ -b^{3, 327}_0 ∨ false 
c  in DIMACS:
-7370 -7371 -7372  0

c i = 328
c  -2+1 --> -1
c    ( b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧  p_984) -> ( b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0)
c  in CNF:
c    -b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨  b^{3, 329}_2
c    -b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_1
c    -b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨  b^{3, 329}_0
c  in DIMACS:
-7373 -7374  7375 -984  7376 0
-7373 -7374  7375 -984 -7377 0
-7373 -7374  7375 -984  7378 0

c  -1+1 --> 0
c    ( b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0 ∧  p_984) -> (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧ -b^{3, 329}_0)
c  in CNF:
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_2
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_1
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_0
c  in DIMACS:
-7373  7374 -7375 -984 -7376 0
-7373  7374 -7375 -984 -7377 0
-7373  7374 -7375 -984 -7378 0

c  0+1 --> 1
c    (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧  p_984) -> (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0)
c  in CNF:
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_2
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_1
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨  b^{3, 329}_0
c  in DIMACS:
 7373  7374  7375 -984 -7376 0
 7373  7374  7375 -984 -7377 0
 7373  7374  7375 -984  7378 0

c  1+1 --> 2
c    (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0 ∧  p_984) -> (-b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0)
c  in CNF:
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_2
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨  b^{3, 329}_1
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ -p_984 ∨ -b^{3, 329}_0
c  in DIMACS:
 7373  7374 -7375 -984 -7376 0
 7373  7374 -7375 -984  7377 0
 7373  7374 -7375 -984 -7378 0

c  2+1 --> break 
c    (-b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧  p_984) -> break
c  in CNF:
c     b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 7373 -7374  7375 -984 1162 0


c  2-1 --> 1
c    (-b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧ -p_984) -> (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0)
c  in CNF:
c     b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_2
c     b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_1
c     b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨  b^{3, 329}_0
c  in DIMACS:
 7373 -7374  7375  984 -7376 0
 7373 -7374  7375  984 -7377 0
 7373 -7374  7375  984  7378 0

c  1-1 --> 0
c    (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0 ∧ -p_984) -> (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧ -b^{3, 329}_0)
c  in CNF:
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_2
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_1
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_0
c  in DIMACS:
 7373  7374 -7375  984 -7376 0
 7373  7374 -7375  984 -7377 0
 7373  7374 -7375  984 -7378 0

c  0-1 --> -1
c    (-b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧ -p_984) -> ( b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0)
c  in CNF:
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨  b^{3, 329}_2
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_1
c     b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨  b^{3, 329}_0
c  in DIMACS:
 7373  7374  7375  984  7376 0
 7373  7374  7375  984 -7377 0
 7373  7374  7375  984  7378 0

c  -1-1 --> -2
c    ( b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧  b^{3, 328}_0 ∧ -p_984) -> ( b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0)
c  in CNF:
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨  b^{3, 329}_2
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨  b^{3, 329}_1
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨  p_984 ∨ -b^{3, 329}_0
c  in DIMACS:
-7373  7374 -7375  984  7376 0
-7373  7374 -7375  984  7377 0
-7373  7374 -7375  984 -7378 0

c  -2-1 --> break 
c    ( b^{3, 328}_2 ∧  b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨  b^{3, 328}_0 ∨  p_984 ∨ break
c  in DIMACS:
-7373 -7374  7375  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 328}_2 ∧ -b^{3, 328}_1 ∧ -b^{3, 328}_0 ∧ true) 
c  in CNF:
c    -b^{3, 328}_2 ∨  b^{3, 328}_1 ∨  b^{3, 328}_0 ∨ false 
c  in DIMACS:
-7373  7374  7375  0

c  3 does not represent an automaton state.
c    -(-b^{3, 328}_2 ∧  b^{3, 328}_1 ∧  b^{3, 328}_0 ∧ true) 
c  in CNF:
c     b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ false 
c  in DIMACS:
 7373 -7374 -7375  0
c  -3 does not represent an automaton state.
c    -( b^{3, 328}_2 ∧  b^{3, 328}_1 ∧  b^{3, 328}_0 ∧ true) 
c  in CNF:
c    -b^{3, 328}_2 ∨ -b^{3, 328}_1 ∨ -b^{3, 328}_0 ∨ false 
c  in DIMACS:
-7373 -7374 -7375  0

c i = 329
c  -2+1 --> -1
c    ( b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧  p_987) -> ( b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0)
c  in CNF:
c    -b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨  b^{3, 330}_2
c    -b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_1
c    -b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨  b^{3, 330}_0
c  in DIMACS:
-7376 -7377  7378 -987  7379 0
-7376 -7377  7378 -987 -7380 0
-7376 -7377  7378 -987  7381 0

c  -1+1 --> 0
c    ( b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0 ∧  p_987) -> (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧ -b^{3, 330}_0)
c  in CNF:
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_2
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_1
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_0
c  in DIMACS:
-7376  7377 -7378 -987 -7379 0
-7376  7377 -7378 -987 -7380 0
-7376  7377 -7378 -987 -7381 0

c  0+1 --> 1
c    (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧  p_987) -> (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0)
c  in CNF:
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_2
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_1
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨  b^{3, 330}_0
c  in DIMACS:
 7376  7377  7378 -987 -7379 0
 7376  7377  7378 -987 -7380 0
 7376  7377  7378 -987  7381 0

c  1+1 --> 2
c    (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0 ∧  p_987) -> (-b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0)
c  in CNF:
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_2
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨  b^{3, 330}_1
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ -p_987 ∨ -b^{3, 330}_0
c  in DIMACS:
 7376  7377 -7378 -987 -7379 0
 7376  7377 -7378 -987  7380 0
 7376  7377 -7378 -987 -7381 0

c  2+1 --> break 
c    (-b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧  p_987) -> break
c  in CNF:
c     b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 7376 -7377  7378 -987 1162 0


c  2-1 --> 1
c    (-b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧ -p_987) -> (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0)
c  in CNF:
c     b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_2
c     b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_1
c     b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨  b^{3, 330}_0
c  in DIMACS:
 7376 -7377  7378  987 -7379 0
 7376 -7377  7378  987 -7380 0
 7376 -7377  7378  987  7381 0

c  1-1 --> 0
c    (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0 ∧ -p_987) -> (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧ -b^{3, 330}_0)
c  in CNF:
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_2
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_1
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_0
c  in DIMACS:
 7376  7377 -7378  987 -7379 0
 7376  7377 -7378  987 -7380 0
 7376  7377 -7378  987 -7381 0

c  0-1 --> -1
c    (-b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧ -p_987) -> ( b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0)
c  in CNF:
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨  b^{3, 330}_2
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_1
c     b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨  b^{3, 330}_0
c  in DIMACS:
 7376  7377  7378  987  7379 0
 7376  7377  7378  987 -7380 0
 7376  7377  7378  987  7381 0

c  -1-1 --> -2
c    ( b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧  b^{3, 329}_0 ∧ -p_987) -> ( b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0)
c  in CNF:
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨  b^{3, 330}_2
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨  b^{3, 330}_1
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨  p_987 ∨ -b^{3, 330}_0
c  in DIMACS:
-7376  7377 -7378  987  7379 0
-7376  7377 -7378  987  7380 0
-7376  7377 -7378  987 -7381 0

c  -2-1 --> break 
c    ( b^{3, 329}_2 ∧  b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨  b^{3, 329}_0 ∨  p_987 ∨ break
c  in DIMACS:
-7376 -7377  7378  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 329}_2 ∧ -b^{3, 329}_1 ∧ -b^{3, 329}_0 ∧ true) 
c  in CNF:
c    -b^{3, 329}_2 ∨  b^{3, 329}_1 ∨  b^{3, 329}_0 ∨ false 
c  in DIMACS:
-7376  7377  7378  0

c  3 does not represent an automaton state.
c    -(-b^{3, 329}_2 ∧  b^{3, 329}_1 ∧  b^{3, 329}_0 ∧ true) 
c  in CNF:
c     b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ false 
c  in DIMACS:
 7376 -7377 -7378  0
c  -3 does not represent an automaton state.
c    -( b^{3, 329}_2 ∧  b^{3, 329}_1 ∧  b^{3, 329}_0 ∧ true) 
c  in CNF:
c    -b^{3, 329}_2 ∨ -b^{3, 329}_1 ∨ -b^{3, 329}_0 ∨ false 
c  in DIMACS:
-7376 -7377 -7378  0

c i = 330
c  -2+1 --> -1
c    ( b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧  p_990) -> ( b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0)
c  in CNF:
c    -b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨  b^{3, 331}_2
c    -b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_1
c    -b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨  b^{3, 331}_0
c  in DIMACS:
-7379 -7380  7381 -990  7382 0
-7379 -7380  7381 -990 -7383 0
-7379 -7380  7381 -990  7384 0

c  -1+1 --> 0
c    ( b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0 ∧  p_990) -> (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧ -b^{3, 331}_0)
c  in CNF:
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_2
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_1
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_0
c  in DIMACS:
-7379  7380 -7381 -990 -7382 0
-7379  7380 -7381 -990 -7383 0
-7379  7380 -7381 -990 -7384 0

c  0+1 --> 1
c    (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧  p_990) -> (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0)
c  in CNF:
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_2
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_1
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨  b^{3, 331}_0
c  in DIMACS:
 7379  7380  7381 -990 -7382 0
 7379  7380  7381 -990 -7383 0
 7379  7380  7381 -990  7384 0

c  1+1 --> 2
c    (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0 ∧  p_990) -> (-b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0)
c  in CNF:
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_2
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨  b^{3, 331}_1
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ -p_990 ∨ -b^{3, 331}_0
c  in DIMACS:
 7379  7380 -7381 -990 -7382 0
 7379  7380 -7381 -990  7383 0
 7379  7380 -7381 -990 -7384 0

c  2+1 --> break 
c    (-b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧  p_990) -> break
c  in CNF:
c     b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 7379 -7380  7381 -990 1162 0


c  2-1 --> 1
c    (-b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧ -p_990) -> (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0)
c  in CNF:
c     b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_2
c     b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_1
c     b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨  b^{3, 331}_0
c  in DIMACS:
 7379 -7380  7381  990 -7382 0
 7379 -7380  7381  990 -7383 0
 7379 -7380  7381  990  7384 0

c  1-1 --> 0
c    (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0 ∧ -p_990) -> (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧ -b^{3, 331}_0)
c  in CNF:
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_2
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_1
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_0
c  in DIMACS:
 7379  7380 -7381  990 -7382 0
 7379  7380 -7381  990 -7383 0
 7379  7380 -7381  990 -7384 0

c  0-1 --> -1
c    (-b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧ -p_990) -> ( b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0)
c  in CNF:
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨  b^{3, 331}_2
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_1
c     b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨  b^{3, 331}_0
c  in DIMACS:
 7379  7380  7381  990  7382 0
 7379  7380  7381  990 -7383 0
 7379  7380  7381  990  7384 0

c  -1-1 --> -2
c    ( b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧  b^{3, 330}_0 ∧ -p_990) -> ( b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0)
c  in CNF:
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨  b^{3, 331}_2
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨  b^{3, 331}_1
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨  p_990 ∨ -b^{3, 331}_0
c  in DIMACS:
-7379  7380 -7381  990  7382 0
-7379  7380 -7381  990  7383 0
-7379  7380 -7381  990 -7384 0

c  -2-1 --> break 
c    ( b^{3, 330}_2 ∧  b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨  b^{3, 330}_0 ∨  p_990 ∨ break
c  in DIMACS:
-7379 -7380  7381  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 330}_2 ∧ -b^{3, 330}_1 ∧ -b^{3, 330}_0 ∧ true) 
c  in CNF:
c    -b^{3, 330}_2 ∨  b^{3, 330}_1 ∨  b^{3, 330}_0 ∨ false 
c  in DIMACS:
-7379  7380  7381  0

c  3 does not represent an automaton state.
c    -(-b^{3, 330}_2 ∧  b^{3, 330}_1 ∧  b^{3, 330}_0 ∧ true) 
c  in CNF:
c     b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ false 
c  in DIMACS:
 7379 -7380 -7381  0
c  -3 does not represent an automaton state.
c    -( b^{3, 330}_2 ∧  b^{3, 330}_1 ∧  b^{3, 330}_0 ∧ true) 
c  in CNF:
c    -b^{3, 330}_2 ∨ -b^{3, 330}_1 ∨ -b^{3, 330}_0 ∨ false 
c  in DIMACS:
-7379 -7380 -7381  0

c i = 331
c  -2+1 --> -1
c    ( b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧  p_993) -> ( b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0)
c  in CNF:
c    -b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨  b^{3, 332}_2
c    -b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_1
c    -b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨  b^{3, 332}_0
c  in DIMACS:
-7382 -7383  7384 -993  7385 0
-7382 -7383  7384 -993 -7386 0
-7382 -7383  7384 -993  7387 0

c  -1+1 --> 0
c    ( b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0 ∧  p_993) -> (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧ -b^{3, 332}_0)
c  in CNF:
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_2
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_1
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_0
c  in DIMACS:
-7382  7383 -7384 -993 -7385 0
-7382  7383 -7384 -993 -7386 0
-7382  7383 -7384 -993 -7387 0

c  0+1 --> 1
c    (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧  p_993) -> (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0)
c  in CNF:
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_2
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_1
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨  b^{3, 332}_0
c  in DIMACS:
 7382  7383  7384 -993 -7385 0
 7382  7383  7384 -993 -7386 0
 7382  7383  7384 -993  7387 0

c  1+1 --> 2
c    (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0 ∧  p_993) -> (-b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0)
c  in CNF:
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_2
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨  b^{3, 332}_1
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ -p_993 ∨ -b^{3, 332}_0
c  in DIMACS:
 7382  7383 -7384 -993 -7385 0
 7382  7383 -7384 -993  7386 0
 7382  7383 -7384 -993 -7387 0

c  2+1 --> break 
c    (-b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧  p_993) -> break
c  in CNF:
c     b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ -p_993 ∨ break
c  in DIMACS:
 7382 -7383  7384 -993 1162 0


c  2-1 --> 1
c    (-b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧ -p_993) -> (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0)
c  in CNF:
c     b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_2
c     b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_1
c     b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨  b^{3, 332}_0
c  in DIMACS:
 7382 -7383  7384  993 -7385 0
 7382 -7383  7384  993 -7386 0
 7382 -7383  7384  993  7387 0

c  1-1 --> 0
c    (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0 ∧ -p_993) -> (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧ -b^{3, 332}_0)
c  in CNF:
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_2
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_1
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_0
c  in DIMACS:
 7382  7383 -7384  993 -7385 0
 7382  7383 -7384  993 -7386 0
 7382  7383 -7384  993 -7387 0

c  0-1 --> -1
c    (-b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧ -p_993) -> ( b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0)
c  in CNF:
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨  b^{3, 332}_2
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_1
c     b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨  b^{3, 332}_0
c  in DIMACS:
 7382  7383  7384  993  7385 0
 7382  7383  7384  993 -7386 0
 7382  7383  7384  993  7387 0

c  -1-1 --> -2
c    ( b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧  b^{3, 331}_0 ∧ -p_993) -> ( b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0)
c  in CNF:
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨  b^{3, 332}_2
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨  b^{3, 332}_1
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨  p_993 ∨ -b^{3, 332}_0
c  in DIMACS:
-7382  7383 -7384  993  7385 0
-7382  7383 -7384  993  7386 0
-7382  7383 -7384  993 -7387 0

c  -2-1 --> break 
c    ( b^{3, 331}_2 ∧  b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧ -p_993) -> break
c  in CNF:
c    -b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨  b^{3, 331}_0 ∨  p_993 ∨ break
c  in DIMACS:
-7382 -7383  7384  993 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 331}_2 ∧ -b^{3, 331}_1 ∧ -b^{3, 331}_0 ∧ true) 
c  in CNF:
c    -b^{3, 331}_2 ∨  b^{3, 331}_1 ∨  b^{3, 331}_0 ∨ false 
c  in DIMACS:
-7382  7383  7384  0

c  3 does not represent an automaton state.
c    -(-b^{3, 331}_2 ∧  b^{3, 331}_1 ∧  b^{3, 331}_0 ∧ true) 
c  in CNF:
c     b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ false 
c  in DIMACS:
 7382 -7383 -7384  0
c  -3 does not represent an automaton state.
c    -( b^{3, 331}_2 ∧  b^{3, 331}_1 ∧  b^{3, 331}_0 ∧ true) 
c  in CNF:
c    -b^{3, 331}_2 ∨ -b^{3, 331}_1 ∨ -b^{3, 331}_0 ∨ false 
c  in DIMACS:
-7382 -7383 -7384  0

c i = 332
c  -2+1 --> -1
c    ( b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧  p_996) -> ( b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0)
c  in CNF:
c    -b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨  b^{3, 333}_2
c    -b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_1
c    -b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨  b^{3, 333}_0
c  in DIMACS:
-7385 -7386  7387 -996  7388 0
-7385 -7386  7387 -996 -7389 0
-7385 -7386  7387 -996  7390 0

c  -1+1 --> 0
c    ( b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0 ∧  p_996) -> (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧ -b^{3, 333}_0)
c  in CNF:
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_2
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_1
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_0
c  in DIMACS:
-7385  7386 -7387 -996 -7388 0
-7385  7386 -7387 -996 -7389 0
-7385  7386 -7387 -996 -7390 0

c  0+1 --> 1
c    (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧  p_996) -> (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0)
c  in CNF:
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_2
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_1
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨  b^{3, 333}_0
c  in DIMACS:
 7385  7386  7387 -996 -7388 0
 7385  7386  7387 -996 -7389 0
 7385  7386  7387 -996  7390 0

c  1+1 --> 2
c    (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0 ∧  p_996) -> (-b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0)
c  in CNF:
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_2
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨  b^{3, 333}_1
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ -p_996 ∨ -b^{3, 333}_0
c  in DIMACS:
 7385  7386 -7387 -996 -7388 0
 7385  7386 -7387 -996  7389 0
 7385  7386 -7387 -996 -7390 0

c  2+1 --> break 
c    (-b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧  p_996) -> break
c  in CNF:
c     b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 7385 -7386  7387 -996 1162 0


c  2-1 --> 1
c    (-b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧ -p_996) -> (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0)
c  in CNF:
c     b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_2
c     b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_1
c     b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨  b^{3, 333}_0
c  in DIMACS:
 7385 -7386  7387  996 -7388 0
 7385 -7386  7387  996 -7389 0
 7385 -7386  7387  996  7390 0

c  1-1 --> 0
c    (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0 ∧ -p_996) -> (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧ -b^{3, 333}_0)
c  in CNF:
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_2
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_1
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_0
c  in DIMACS:
 7385  7386 -7387  996 -7388 0
 7385  7386 -7387  996 -7389 0
 7385  7386 -7387  996 -7390 0

c  0-1 --> -1
c    (-b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧ -p_996) -> ( b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0)
c  in CNF:
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨  b^{3, 333}_2
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_1
c     b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨  b^{3, 333}_0
c  in DIMACS:
 7385  7386  7387  996  7388 0
 7385  7386  7387  996 -7389 0
 7385  7386  7387  996  7390 0

c  -1-1 --> -2
c    ( b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧  b^{3, 332}_0 ∧ -p_996) -> ( b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0)
c  in CNF:
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨  b^{3, 333}_2
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨  b^{3, 333}_1
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨  p_996 ∨ -b^{3, 333}_0
c  in DIMACS:
-7385  7386 -7387  996  7388 0
-7385  7386 -7387  996  7389 0
-7385  7386 -7387  996 -7390 0

c  -2-1 --> break 
c    ( b^{3, 332}_2 ∧  b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨  b^{3, 332}_0 ∨  p_996 ∨ break
c  in DIMACS:
-7385 -7386  7387  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 332}_2 ∧ -b^{3, 332}_1 ∧ -b^{3, 332}_0 ∧ true) 
c  in CNF:
c    -b^{3, 332}_2 ∨  b^{3, 332}_1 ∨  b^{3, 332}_0 ∨ false 
c  in DIMACS:
-7385  7386  7387  0

c  3 does not represent an automaton state.
c    -(-b^{3, 332}_2 ∧  b^{3, 332}_1 ∧  b^{3, 332}_0 ∧ true) 
c  in CNF:
c     b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ false 
c  in DIMACS:
 7385 -7386 -7387  0
c  -3 does not represent an automaton state.
c    -( b^{3, 332}_2 ∧  b^{3, 332}_1 ∧  b^{3, 332}_0 ∧ true) 
c  in CNF:
c    -b^{3, 332}_2 ∨ -b^{3, 332}_1 ∨ -b^{3, 332}_0 ∨ false 
c  in DIMACS:
-7385 -7386 -7387  0

c i = 333
c  -2+1 --> -1
c    ( b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧  p_999) -> ( b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0)
c  in CNF:
c    -b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨  b^{3, 334}_2
c    -b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_1
c    -b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨  b^{3, 334}_0
c  in DIMACS:
-7388 -7389  7390 -999  7391 0
-7388 -7389  7390 -999 -7392 0
-7388 -7389  7390 -999  7393 0

c  -1+1 --> 0
c    ( b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0 ∧  p_999) -> (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧ -b^{3, 334}_0)
c  in CNF:
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_2
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_1
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_0
c  in DIMACS:
-7388  7389 -7390 -999 -7391 0
-7388  7389 -7390 -999 -7392 0
-7388  7389 -7390 -999 -7393 0

c  0+1 --> 1
c    (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧  p_999) -> (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0)
c  in CNF:
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_2
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_1
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨  b^{3, 334}_0
c  in DIMACS:
 7388  7389  7390 -999 -7391 0
 7388  7389  7390 -999 -7392 0
 7388  7389  7390 -999  7393 0

c  1+1 --> 2
c    (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0 ∧  p_999) -> (-b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0)
c  in CNF:
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_2
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨  b^{3, 334}_1
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ -p_999 ∨ -b^{3, 334}_0
c  in DIMACS:
 7388  7389 -7390 -999 -7391 0
 7388  7389 -7390 -999  7392 0
 7388  7389 -7390 -999 -7393 0

c  2+1 --> break 
c    (-b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧  p_999) -> break
c  in CNF:
c     b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 7388 -7389  7390 -999 1162 0


c  2-1 --> 1
c    (-b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧ -p_999) -> (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0)
c  in CNF:
c     b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_2
c     b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_1
c     b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨  b^{3, 334}_0
c  in DIMACS:
 7388 -7389  7390  999 -7391 0
 7388 -7389  7390  999 -7392 0
 7388 -7389  7390  999  7393 0

c  1-1 --> 0
c    (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0 ∧ -p_999) -> (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧ -b^{3, 334}_0)
c  in CNF:
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_2
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_1
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_0
c  in DIMACS:
 7388  7389 -7390  999 -7391 0
 7388  7389 -7390  999 -7392 0
 7388  7389 -7390  999 -7393 0

c  0-1 --> -1
c    (-b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧ -p_999) -> ( b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0)
c  in CNF:
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨  b^{3, 334}_2
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_1
c     b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨  b^{3, 334}_0
c  in DIMACS:
 7388  7389  7390  999  7391 0
 7388  7389  7390  999 -7392 0
 7388  7389  7390  999  7393 0

c  -1-1 --> -2
c    ( b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧  b^{3, 333}_0 ∧ -p_999) -> ( b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0)
c  in CNF:
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨  b^{3, 334}_2
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨  b^{3, 334}_1
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨  p_999 ∨ -b^{3, 334}_0
c  in DIMACS:
-7388  7389 -7390  999  7391 0
-7388  7389 -7390  999  7392 0
-7388  7389 -7390  999 -7393 0

c  -2-1 --> break 
c    ( b^{3, 333}_2 ∧  b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨  b^{3, 333}_0 ∨  p_999 ∨ break
c  in DIMACS:
-7388 -7389  7390  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 333}_2 ∧ -b^{3, 333}_1 ∧ -b^{3, 333}_0 ∧ true) 
c  in CNF:
c    -b^{3, 333}_2 ∨  b^{3, 333}_1 ∨  b^{3, 333}_0 ∨ false 
c  in DIMACS:
-7388  7389  7390  0

c  3 does not represent an automaton state.
c    -(-b^{3, 333}_2 ∧  b^{3, 333}_1 ∧  b^{3, 333}_0 ∧ true) 
c  in CNF:
c     b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ false 
c  in DIMACS:
 7388 -7389 -7390  0
c  -3 does not represent an automaton state.
c    -( b^{3, 333}_2 ∧  b^{3, 333}_1 ∧  b^{3, 333}_0 ∧ true) 
c  in CNF:
c    -b^{3, 333}_2 ∨ -b^{3, 333}_1 ∨ -b^{3, 333}_0 ∨ false 
c  in DIMACS:
-7388 -7389 -7390  0

c i = 334
c  -2+1 --> -1
c    ( b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧  p_1002) -> ( b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0)
c  in CNF:
c    -b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨  b^{3, 335}_2
c    -b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_1
c    -b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨  b^{3, 335}_0
c  in DIMACS:
-7391 -7392  7393 -1002  7394 0
-7391 -7392  7393 -1002 -7395 0
-7391 -7392  7393 -1002  7396 0

c  -1+1 --> 0
c    ( b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0 ∧  p_1002) -> (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧ -b^{3, 335}_0)
c  in CNF:
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_2
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_1
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_0
c  in DIMACS:
-7391  7392 -7393 -1002 -7394 0
-7391  7392 -7393 -1002 -7395 0
-7391  7392 -7393 -1002 -7396 0

c  0+1 --> 1
c    (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧  p_1002) -> (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0)
c  in CNF:
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_2
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_1
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨  b^{3, 335}_0
c  in DIMACS:
 7391  7392  7393 -1002 -7394 0
 7391  7392  7393 -1002 -7395 0
 7391  7392  7393 -1002  7396 0

c  1+1 --> 2
c    (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0 ∧  p_1002) -> (-b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0)
c  in CNF:
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_2
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨  b^{3, 335}_1
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ -p_1002 ∨ -b^{3, 335}_0
c  in DIMACS:
 7391  7392 -7393 -1002 -7394 0
 7391  7392 -7393 -1002  7395 0
 7391  7392 -7393 -1002 -7396 0

c  2+1 --> break 
c    (-b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 7391 -7392  7393 -1002 1162 0


c  2-1 --> 1
c    (-b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧ -p_1002) -> (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0)
c  in CNF:
c     b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_2
c     b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_1
c     b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨  b^{3, 335}_0
c  in DIMACS:
 7391 -7392  7393  1002 -7394 0
 7391 -7392  7393  1002 -7395 0
 7391 -7392  7393  1002  7396 0

c  1-1 --> 0
c    (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0 ∧ -p_1002) -> (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧ -b^{3, 335}_0)
c  in CNF:
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_2
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_1
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_0
c  in DIMACS:
 7391  7392 -7393  1002 -7394 0
 7391  7392 -7393  1002 -7395 0
 7391  7392 -7393  1002 -7396 0

c  0-1 --> -1
c    (-b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧ -p_1002) -> ( b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0)
c  in CNF:
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨  b^{3, 335}_2
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_1
c     b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨  b^{3, 335}_0
c  in DIMACS:
 7391  7392  7393  1002  7394 0
 7391  7392  7393  1002 -7395 0
 7391  7392  7393  1002  7396 0

c  -1-1 --> -2
c    ( b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧  b^{3, 334}_0 ∧ -p_1002) -> ( b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0)
c  in CNF:
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨  b^{3, 335}_2
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨  b^{3, 335}_1
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨  p_1002 ∨ -b^{3, 335}_0
c  in DIMACS:
-7391  7392 -7393  1002  7394 0
-7391  7392 -7393  1002  7395 0
-7391  7392 -7393  1002 -7396 0

c  -2-1 --> break 
c    ( b^{3, 334}_2 ∧  b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨  b^{3, 334}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-7391 -7392  7393  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 334}_2 ∧ -b^{3, 334}_1 ∧ -b^{3, 334}_0 ∧ true) 
c  in CNF:
c    -b^{3, 334}_2 ∨  b^{3, 334}_1 ∨  b^{3, 334}_0 ∨ false 
c  in DIMACS:
-7391  7392  7393  0

c  3 does not represent an automaton state.
c    -(-b^{3, 334}_2 ∧  b^{3, 334}_1 ∧  b^{3, 334}_0 ∧ true) 
c  in CNF:
c     b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ false 
c  in DIMACS:
 7391 -7392 -7393  0
c  -3 does not represent an automaton state.
c    -( b^{3, 334}_2 ∧  b^{3, 334}_1 ∧  b^{3, 334}_0 ∧ true) 
c  in CNF:
c    -b^{3, 334}_2 ∨ -b^{3, 334}_1 ∨ -b^{3, 334}_0 ∨ false 
c  in DIMACS:
-7391 -7392 -7393  0

c i = 335
c  -2+1 --> -1
c    ( b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧  p_1005) -> ( b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0)
c  in CNF:
c    -b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨  b^{3, 336}_2
c    -b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_1
c    -b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨  b^{3, 336}_0
c  in DIMACS:
-7394 -7395  7396 -1005  7397 0
-7394 -7395  7396 -1005 -7398 0
-7394 -7395  7396 -1005  7399 0

c  -1+1 --> 0
c    ( b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0 ∧  p_1005) -> (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧ -b^{3, 336}_0)
c  in CNF:
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_2
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_1
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_0
c  in DIMACS:
-7394  7395 -7396 -1005 -7397 0
-7394  7395 -7396 -1005 -7398 0
-7394  7395 -7396 -1005 -7399 0

c  0+1 --> 1
c    (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧  p_1005) -> (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0)
c  in CNF:
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_2
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_1
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨  b^{3, 336}_0
c  in DIMACS:
 7394  7395  7396 -1005 -7397 0
 7394  7395  7396 -1005 -7398 0
 7394  7395  7396 -1005  7399 0

c  1+1 --> 2
c    (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0 ∧  p_1005) -> (-b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0)
c  in CNF:
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_2
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨  b^{3, 336}_1
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ -p_1005 ∨ -b^{3, 336}_0
c  in DIMACS:
 7394  7395 -7396 -1005 -7397 0
 7394  7395 -7396 -1005  7398 0
 7394  7395 -7396 -1005 -7399 0

c  2+1 --> break 
c    (-b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 7394 -7395  7396 -1005 1162 0


c  2-1 --> 1
c    (-b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧ -p_1005) -> (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0)
c  in CNF:
c     b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_2
c     b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_1
c     b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨  b^{3, 336}_0
c  in DIMACS:
 7394 -7395  7396  1005 -7397 0
 7394 -7395  7396  1005 -7398 0
 7394 -7395  7396  1005  7399 0

c  1-1 --> 0
c    (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0 ∧ -p_1005) -> (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧ -b^{3, 336}_0)
c  in CNF:
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_2
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_1
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_0
c  in DIMACS:
 7394  7395 -7396  1005 -7397 0
 7394  7395 -7396  1005 -7398 0
 7394  7395 -7396  1005 -7399 0

c  0-1 --> -1
c    (-b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧ -p_1005) -> ( b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0)
c  in CNF:
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨  b^{3, 336}_2
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_1
c     b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨  b^{3, 336}_0
c  in DIMACS:
 7394  7395  7396  1005  7397 0
 7394  7395  7396  1005 -7398 0
 7394  7395  7396  1005  7399 0

c  -1-1 --> -2
c    ( b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧  b^{3, 335}_0 ∧ -p_1005) -> ( b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0)
c  in CNF:
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨  b^{3, 336}_2
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨  b^{3, 336}_1
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨  p_1005 ∨ -b^{3, 336}_0
c  in DIMACS:
-7394  7395 -7396  1005  7397 0
-7394  7395 -7396  1005  7398 0
-7394  7395 -7396  1005 -7399 0

c  -2-1 --> break 
c    ( b^{3, 335}_2 ∧  b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨  b^{3, 335}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-7394 -7395  7396  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 335}_2 ∧ -b^{3, 335}_1 ∧ -b^{3, 335}_0 ∧ true) 
c  in CNF:
c    -b^{3, 335}_2 ∨  b^{3, 335}_1 ∨  b^{3, 335}_0 ∨ false 
c  in DIMACS:
-7394  7395  7396  0

c  3 does not represent an automaton state.
c    -(-b^{3, 335}_2 ∧  b^{3, 335}_1 ∧  b^{3, 335}_0 ∧ true) 
c  in CNF:
c     b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ false 
c  in DIMACS:
 7394 -7395 -7396  0
c  -3 does not represent an automaton state.
c    -( b^{3, 335}_2 ∧  b^{3, 335}_1 ∧  b^{3, 335}_0 ∧ true) 
c  in CNF:
c    -b^{3, 335}_2 ∨ -b^{3, 335}_1 ∨ -b^{3, 335}_0 ∨ false 
c  in DIMACS:
-7394 -7395 -7396  0

c i = 336
c  -2+1 --> -1
c    ( b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧  p_1008) -> ( b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0)
c  in CNF:
c    -b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨  b^{3, 337}_2
c    -b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_1
c    -b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨  b^{3, 337}_0
c  in DIMACS:
-7397 -7398  7399 -1008  7400 0
-7397 -7398  7399 -1008 -7401 0
-7397 -7398  7399 -1008  7402 0

c  -1+1 --> 0
c    ( b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0 ∧  p_1008) -> (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧ -b^{3, 337}_0)
c  in CNF:
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_2
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_1
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_0
c  in DIMACS:
-7397  7398 -7399 -1008 -7400 0
-7397  7398 -7399 -1008 -7401 0
-7397  7398 -7399 -1008 -7402 0

c  0+1 --> 1
c    (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧  p_1008) -> (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0)
c  in CNF:
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_2
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_1
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨  b^{3, 337}_0
c  in DIMACS:
 7397  7398  7399 -1008 -7400 0
 7397  7398  7399 -1008 -7401 0
 7397  7398  7399 -1008  7402 0

c  1+1 --> 2
c    (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0 ∧  p_1008) -> (-b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0)
c  in CNF:
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_2
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨  b^{3, 337}_1
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ -p_1008 ∨ -b^{3, 337}_0
c  in DIMACS:
 7397  7398 -7399 -1008 -7400 0
 7397  7398 -7399 -1008  7401 0
 7397  7398 -7399 -1008 -7402 0

c  2+1 --> break 
c    (-b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 7397 -7398  7399 -1008 1162 0


c  2-1 --> 1
c    (-b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧ -p_1008) -> (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0)
c  in CNF:
c     b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_2
c     b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_1
c     b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨  b^{3, 337}_0
c  in DIMACS:
 7397 -7398  7399  1008 -7400 0
 7397 -7398  7399  1008 -7401 0
 7397 -7398  7399  1008  7402 0

c  1-1 --> 0
c    (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0 ∧ -p_1008) -> (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧ -b^{3, 337}_0)
c  in CNF:
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_2
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_1
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_0
c  in DIMACS:
 7397  7398 -7399  1008 -7400 0
 7397  7398 -7399  1008 -7401 0
 7397  7398 -7399  1008 -7402 0

c  0-1 --> -1
c    (-b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧ -p_1008) -> ( b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0)
c  in CNF:
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨  b^{3, 337}_2
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_1
c     b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨  b^{3, 337}_0
c  in DIMACS:
 7397  7398  7399  1008  7400 0
 7397  7398  7399  1008 -7401 0
 7397  7398  7399  1008  7402 0

c  -1-1 --> -2
c    ( b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧  b^{3, 336}_0 ∧ -p_1008) -> ( b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0)
c  in CNF:
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨  b^{3, 337}_2
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨  b^{3, 337}_1
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨  p_1008 ∨ -b^{3, 337}_0
c  in DIMACS:
-7397  7398 -7399  1008  7400 0
-7397  7398 -7399  1008  7401 0
-7397  7398 -7399  1008 -7402 0

c  -2-1 --> break 
c    ( b^{3, 336}_2 ∧  b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨  b^{3, 336}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-7397 -7398  7399  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 336}_2 ∧ -b^{3, 336}_1 ∧ -b^{3, 336}_0 ∧ true) 
c  in CNF:
c    -b^{3, 336}_2 ∨  b^{3, 336}_1 ∨  b^{3, 336}_0 ∨ false 
c  in DIMACS:
-7397  7398  7399  0

c  3 does not represent an automaton state.
c    -(-b^{3, 336}_2 ∧  b^{3, 336}_1 ∧  b^{3, 336}_0 ∧ true) 
c  in CNF:
c     b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ false 
c  in DIMACS:
 7397 -7398 -7399  0
c  -3 does not represent an automaton state.
c    -( b^{3, 336}_2 ∧  b^{3, 336}_1 ∧  b^{3, 336}_0 ∧ true) 
c  in CNF:
c    -b^{3, 336}_2 ∨ -b^{3, 336}_1 ∨ -b^{3, 336}_0 ∨ false 
c  in DIMACS:
-7397 -7398 -7399  0

c i = 337
c  -2+1 --> -1
c    ( b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧  p_1011) -> ( b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0)
c  in CNF:
c    -b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨  b^{3, 338}_2
c    -b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_1
c    -b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨  b^{3, 338}_0
c  in DIMACS:
-7400 -7401  7402 -1011  7403 0
-7400 -7401  7402 -1011 -7404 0
-7400 -7401  7402 -1011  7405 0

c  -1+1 --> 0
c    ( b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0 ∧  p_1011) -> (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧ -b^{3, 338}_0)
c  in CNF:
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_2
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_1
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_0
c  in DIMACS:
-7400  7401 -7402 -1011 -7403 0
-7400  7401 -7402 -1011 -7404 0
-7400  7401 -7402 -1011 -7405 0

c  0+1 --> 1
c    (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧  p_1011) -> (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0)
c  in CNF:
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_2
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_1
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨  b^{3, 338}_0
c  in DIMACS:
 7400  7401  7402 -1011 -7403 0
 7400  7401  7402 -1011 -7404 0
 7400  7401  7402 -1011  7405 0

c  1+1 --> 2
c    (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0 ∧  p_1011) -> (-b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0)
c  in CNF:
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_2
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨  b^{3, 338}_1
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ -p_1011 ∨ -b^{3, 338}_0
c  in DIMACS:
 7400  7401 -7402 -1011 -7403 0
 7400  7401 -7402 -1011  7404 0
 7400  7401 -7402 -1011 -7405 0

c  2+1 --> break 
c    (-b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧  p_1011) -> break
c  in CNF:
c     b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ -p_1011 ∨ break
c  in DIMACS:
 7400 -7401  7402 -1011 1162 0


c  2-1 --> 1
c    (-b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧ -p_1011) -> (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0)
c  in CNF:
c     b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_2
c     b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_1
c     b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨  b^{3, 338}_0
c  in DIMACS:
 7400 -7401  7402  1011 -7403 0
 7400 -7401  7402  1011 -7404 0
 7400 -7401  7402  1011  7405 0

c  1-1 --> 0
c    (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0 ∧ -p_1011) -> (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧ -b^{3, 338}_0)
c  in CNF:
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_2
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_1
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_0
c  in DIMACS:
 7400  7401 -7402  1011 -7403 0
 7400  7401 -7402  1011 -7404 0
 7400  7401 -7402  1011 -7405 0

c  0-1 --> -1
c    (-b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧ -p_1011) -> ( b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0)
c  in CNF:
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨  b^{3, 338}_2
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_1
c     b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨  b^{3, 338}_0
c  in DIMACS:
 7400  7401  7402  1011  7403 0
 7400  7401  7402  1011 -7404 0
 7400  7401  7402  1011  7405 0

c  -1-1 --> -2
c    ( b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧  b^{3, 337}_0 ∧ -p_1011) -> ( b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0)
c  in CNF:
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨  b^{3, 338}_2
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨  b^{3, 338}_1
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨  p_1011 ∨ -b^{3, 338}_0
c  in DIMACS:
-7400  7401 -7402  1011  7403 0
-7400  7401 -7402  1011  7404 0
-7400  7401 -7402  1011 -7405 0

c  -2-1 --> break 
c    ( b^{3, 337}_2 ∧  b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧ -p_1011) -> break
c  in CNF:
c    -b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨  b^{3, 337}_0 ∨  p_1011 ∨ break
c  in DIMACS:
-7400 -7401  7402  1011 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 337}_2 ∧ -b^{3, 337}_1 ∧ -b^{3, 337}_0 ∧ true) 
c  in CNF:
c    -b^{3, 337}_2 ∨  b^{3, 337}_1 ∨  b^{3, 337}_0 ∨ false 
c  in DIMACS:
-7400  7401  7402  0

c  3 does not represent an automaton state.
c    -(-b^{3, 337}_2 ∧  b^{3, 337}_1 ∧  b^{3, 337}_0 ∧ true) 
c  in CNF:
c     b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ false 
c  in DIMACS:
 7400 -7401 -7402  0
c  -3 does not represent an automaton state.
c    -( b^{3, 337}_2 ∧  b^{3, 337}_1 ∧  b^{3, 337}_0 ∧ true) 
c  in CNF:
c    -b^{3, 337}_2 ∨ -b^{3, 337}_1 ∨ -b^{3, 337}_0 ∨ false 
c  in DIMACS:
-7400 -7401 -7402  0

c i = 338
c  -2+1 --> -1
c    ( b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧  p_1014) -> ( b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0)
c  in CNF:
c    -b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨  b^{3, 339}_2
c    -b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_1
c    -b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨  b^{3, 339}_0
c  in DIMACS:
-7403 -7404  7405 -1014  7406 0
-7403 -7404  7405 -1014 -7407 0
-7403 -7404  7405 -1014  7408 0

c  -1+1 --> 0
c    ( b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0 ∧  p_1014) -> (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧ -b^{3, 339}_0)
c  in CNF:
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_2
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_1
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_0
c  in DIMACS:
-7403  7404 -7405 -1014 -7406 0
-7403  7404 -7405 -1014 -7407 0
-7403  7404 -7405 -1014 -7408 0

c  0+1 --> 1
c    (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧  p_1014) -> (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0)
c  in CNF:
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_2
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_1
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨  b^{3, 339}_0
c  in DIMACS:
 7403  7404  7405 -1014 -7406 0
 7403  7404  7405 -1014 -7407 0
 7403  7404  7405 -1014  7408 0

c  1+1 --> 2
c    (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0 ∧  p_1014) -> (-b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0)
c  in CNF:
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_2
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨  b^{3, 339}_1
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ -p_1014 ∨ -b^{3, 339}_0
c  in DIMACS:
 7403  7404 -7405 -1014 -7406 0
 7403  7404 -7405 -1014  7407 0
 7403  7404 -7405 -1014 -7408 0

c  2+1 --> break 
c    (-b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 7403 -7404  7405 -1014 1162 0


c  2-1 --> 1
c    (-b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧ -p_1014) -> (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0)
c  in CNF:
c     b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_2
c     b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_1
c     b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨  b^{3, 339}_0
c  in DIMACS:
 7403 -7404  7405  1014 -7406 0
 7403 -7404  7405  1014 -7407 0
 7403 -7404  7405  1014  7408 0

c  1-1 --> 0
c    (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0 ∧ -p_1014) -> (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧ -b^{3, 339}_0)
c  in CNF:
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_2
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_1
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_0
c  in DIMACS:
 7403  7404 -7405  1014 -7406 0
 7403  7404 -7405  1014 -7407 0
 7403  7404 -7405  1014 -7408 0

c  0-1 --> -1
c    (-b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧ -p_1014) -> ( b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0)
c  in CNF:
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨  b^{3, 339}_2
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_1
c     b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨  b^{3, 339}_0
c  in DIMACS:
 7403  7404  7405  1014  7406 0
 7403  7404  7405  1014 -7407 0
 7403  7404  7405  1014  7408 0

c  -1-1 --> -2
c    ( b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧  b^{3, 338}_0 ∧ -p_1014) -> ( b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0)
c  in CNF:
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨  b^{3, 339}_2
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨  b^{3, 339}_1
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨  p_1014 ∨ -b^{3, 339}_0
c  in DIMACS:
-7403  7404 -7405  1014  7406 0
-7403  7404 -7405  1014  7407 0
-7403  7404 -7405  1014 -7408 0

c  -2-1 --> break 
c    ( b^{3, 338}_2 ∧  b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨  b^{3, 338}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-7403 -7404  7405  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 338}_2 ∧ -b^{3, 338}_1 ∧ -b^{3, 338}_0 ∧ true) 
c  in CNF:
c    -b^{3, 338}_2 ∨  b^{3, 338}_1 ∨  b^{3, 338}_0 ∨ false 
c  in DIMACS:
-7403  7404  7405  0

c  3 does not represent an automaton state.
c    -(-b^{3, 338}_2 ∧  b^{3, 338}_1 ∧  b^{3, 338}_0 ∧ true) 
c  in CNF:
c     b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ false 
c  in DIMACS:
 7403 -7404 -7405  0
c  -3 does not represent an automaton state.
c    -( b^{3, 338}_2 ∧  b^{3, 338}_1 ∧  b^{3, 338}_0 ∧ true) 
c  in CNF:
c    -b^{3, 338}_2 ∨ -b^{3, 338}_1 ∨ -b^{3, 338}_0 ∨ false 
c  in DIMACS:
-7403 -7404 -7405  0

c i = 339
c  -2+1 --> -1
c    ( b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧  p_1017) -> ( b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0)
c  in CNF:
c    -b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨  b^{3, 340}_2
c    -b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_1
c    -b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨  b^{3, 340}_0
c  in DIMACS:
-7406 -7407  7408 -1017  7409 0
-7406 -7407  7408 -1017 -7410 0
-7406 -7407  7408 -1017  7411 0

c  -1+1 --> 0
c    ( b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0 ∧  p_1017) -> (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧ -b^{3, 340}_0)
c  in CNF:
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_2
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_1
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_0
c  in DIMACS:
-7406  7407 -7408 -1017 -7409 0
-7406  7407 -7408 -1017 -7410 0
-7406  7407 -7408 -1017 -7411 0

c  0+1 --> 1
c    (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧  p_1017) -> (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0)
c  in CNF:
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_2
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_1
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨  b^{3, 340}_0
c  in DIMACS:
 7406  7407  7408 -1017 -7409 0
 7406  7407  7408 -1017 -7410 0
 7406  7407  7408 -1017  7411 0

c  1+1 --> 2
c    (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0 ∧  p_1017) -> (-b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0)
c  in CNF:
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_2
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨  b^{3, 340}_1
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ -p_1017 ∨ -b^{3, 340}_0
c  in DIMACS:
 7406  7407 -7408 -1017 -7409 0
 7406  7407 -7408 -1017  7410 0
 7406  7407 -7408 -1017 -7411 0

c  2+1 --> break 
c    (-b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧  p_1017) -> break
c  in CNF:
c     b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ -p_1017 ∨ break
c  in DIMACS:
 7406 -7407  7408 -1017 1162 0


c  2-1 --> 1
c    (-b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧ -p_1017) -> (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0)
c  in CNF:
c     b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_2
c     b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_1
c     b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨  b^{3, 340}_0
c  in DIMACS:
 7406 -7407  7408  1017 -7409 0
 7406 -7407  7408  1017 -7410 0
 7406 -7407  7408  1017  7411 0

c  1-1 --> 0
c    (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0 ∧ -p_1017) -> (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧ -b^{3, 340}_0)
c  in CNF:
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_2
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_1
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_0
c  in DIMACS:
 7406  7407 -7408  1017 -7409 0
 7406  7407 -7408  1017 -7410 0
 7406  7407 -7408  1017 -7411 0

c  0-1 --> -1
c    (-b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧ -p_1017) -> ( b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0)
c  in CNF:
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨  b^{3, 340}_2
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_1
c     b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨  b^{3, 340}_0
c  in DIMACS:
 7406  7407  7408  1017  7409 0
 7406  7407  7408  1017 -7410 0
 7406  7407  7408  1017  7411 0

c  -1-1 --> -2
c    ( b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧  b^{3, 339}_0 ∧ -p_1017) -> ( b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0)
c  in CNF:
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨  b^{3, 340}_2
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨  b^{3, 340}_1
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨  p_1017 ∨ -b^{3, 340}_0
c  in DIMACS:
-7406  7407 -7408  1017  7409 0
-7406  7407 -7408  1017  7410 0
-7406  7407 -7408  1017 -7411 0

c  -2-1 --> break 
c    ( b^{3, 339}_2 ∧  b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧ -p_1017) -> break
c  in CNF:
c    -b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨  b^{3, 339}_0 ∨  p_1017 ∨ break
c  in DIMACS:
-7406 -7407  7408  1017 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 339}_2 ∧ -b^{3, 339}_1 ∧ -b^{3, 339}_0 ∧ true) 
c  in CNF:
c    -b^{3, 339}_2 ∨  b^{3, 339}_1 ∨  b^{3, 339}_0 ∨ false 
c  in DIMACS:
-7406  7407  7408  0

c  3 does not represent an automaton state.
c    -(-b^{3, 339}_2 ∧  b^{3, 339}_1 ∧  b^{3, 339}_0 ∧ true) 
c  in CNF:
c     b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ false 
c  in DIMACS:
 7406 -7407 -7408  0
c  -3 does not represent an automaton state.
c    -( b^{3, 339}_2 ∧  b^{3, 339}_1 ∧  b^{3, 339}_0 ∧ true) 
c  in CNF:
c    -b^{3, 339}_2 ∨ -b^{3, 339}_1 ∨ -b^{3, 339}_0 ∨ false 
c  in DIMACS:
-7406 -7407 -7408  0

c i = 340
c  -2+1 --> -1
c    ( b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧  p_1020) -> ( b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0)
c  in CNF:
c    -b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨  b^{3, 341}_2
c    -b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_1
c    -b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨  b^{3, 341}_0
c  in DIMACS:
-7409 -7410  7411 -1020  7412 0
-7409 -7410  7411 -1020 -7413 0
-7409 -7410  7411 -1020  7414 0

c  -1+1 --> 0
c    ( b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0 ∧  p_1020) -> (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧ -b^{3, 341}_0)
c  in CNF:
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_2
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_1
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_0
c  in DIMACS:
-7409  7410 -7411 -1020 -7412 0
-7409  7410 -7411 -1020 -7413 0
-7409  7410 -7411 -1020 -7414 0

c  0+1 --> 1
c    (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧  p_1020) -> (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0)
c  in CNF:
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_2
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_1
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨  b^{3, 341}_0
c  in DIMACS:
 7409  7410  7411 -1020 -7412 0
 7409  7410  7411 -1020 -7413 0
 7409  7410  7411 -1020  7414 0

c  1+1 --> 2
c    (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0 ∧  p_1020) -> (-b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0)
c  in CNF:
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_2
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨  b^{3, 341}_1
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ -p_1020 ∨ -b^{3, 341}_0
c  in DIMACS:
 7409  7410 -7411 -1020 -7412 0
 7409  7410 -7411 -1020  7413 0
 7409  7410 -7411 -1020 -7414 0

c  2+1 --> break 
c    (-b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 7409 -7410  7411 -1020 1162 0


c  2-1 --> 1
c    (-b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧ -p_1020) -> (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0)
c  in CNF:
c     b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_2
c     b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_1
c     b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨  b^{3, 341}_0
c  in DIMACS:
 7409 -7410  7411  1020 -7412 0
 7409 -7410  7411  1020 -7413 0
 7409 -7410  7411  1020  7414 0

c  1-1 --> 0
c    (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0 ∧ -p_1020) -> (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧ -b^{3, 341}_0)
c  in CNF:
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_2
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_1
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_0
c  in DIMACS:
 7409  7410 -7411  1020 -7412 0
 7409  7410 -7411  1020 -7413 0
 7409  7410 -7411  1020 -7414 0

c  0-1 --> -1
c    (-b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧ -p_1020) -> ( b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0)
c  in CNF:
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨  b^{3, 341}_2
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_1
c     b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨  b^{3, 341}_0
c  in DIMACS:
 7409  7410  7411  1020  7412 0
 7409  7410  7411  1020 -7413 0
 7409  7410  7411  1020  7414 0

c  -1-1 --> -2
c    ( b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧  b^{3, 340}_0 ∧ -p_1020) -> ( b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0)
c  in CNF:
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨  b^{3, 341}_2
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨  b^{3, 341}_1
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨  p_1020 ∨ -b^{3, 341}_0
c  in DIMACS:
-7409  7410 -7411  1020  7412 0
-7409  7410 -7411  1020  7413 0
-7409  7410 -7411  1020 -7414 0

c  -2-1 --> break 
c    ( b^{3, 340}_2 ∧  b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨  b^{3, 340}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-7409 -7410  7411  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 340}_2 ∧ -b^{3, 340}_1 ∧ -b^{3, 340}_0 ∧ true) 
c  in CNF:
c    -b^{3, 340}_2 ∨  b^{3, 340}_1 ∨  b^{3, 340}_0 ∨ false 
c  in DIMACS:
-7409  7410  7411  0

c  3 does not represent an automaton state.
c    -(-b^{3, 340}_2 ∧  b^{3, 340}_1 ∧  b^{3, 340}_0 ∧ true) 
c  in CNF:
c     b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ false 
c  in DIMACS:
 7409 -7410 -7411  0
c  -3 does not represent an automaton state.
c    -( b^{3, 340}_2 ∧  b^{3, 340}_1 ∧  b^{3, 340}_0 ∧ true) 
c  in CNF:
c    -b^{3, 340}_2 ∨ -b^{3, 340}_1 ∨ -b^{3, 340}_0 ∨ false 
c  in DIMACS:
-7409 -7410 -7411  0

c i = 341
c  -2+1 --> -1
c    ( b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧  p_1023) -> ( b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0)
c  in CNF:
c    -b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨  b^{3, 342}_2
c    -b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_1
c    -b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨  b^{3, 342}_0
c  in DIMACS:
-7412 -7413  7414 -1023  7415 0
-7412 -7413  7414 -1023 -7416 0
-7412 -7413  7414 -1023  7417 0

c  -1+1 --> 0
c    ( b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0 ∧  p_1023) -> (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧ -b^{3, 342}_0)
c  in CNF:
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_2
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_1
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_0
c  in DIMACS:
-7412  7413 -7414 -1023 -7415 0
-7412  7413 -7414 -1023 -7416 0
-7412  7413 -7414 -1023 -7417 0

c  0+1 --> 1
c    (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧  p_1023) -> (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0)
c  in CNF:
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_2
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_1
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨  b^{3, 342}_0
c  in DIMACS:
 7412  7413  7414 -1023 -7415 0
 7412  7413  7414 -1023 -7416 0
 7412  7413  7414 -1023  7417 0

c  1+1 --> 2
c    (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0 ∧  p_1023) -> (-b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0)
c  in CNF:
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_2
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨  b^{3, 342}_1
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ -p_1023 ∨ -b^{3, 342}_0
c  in DIMACS:
 7412  7413 -7414 -1023 -7415 0
 7412  7413 -7414 -1023  7416 0
 7412  7413 -7414 -1023 -7417 0

c  2+1 --> break 
c    (-b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 7412 -7413  7414 -1023 1162 0


c  2-1 --> 1
c    (-b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧ -p_1023) -> (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0)
c  in CNF:
c     b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_2
c     b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_1
c     b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨  b^{3, 342}_0
c  in DIMACS:
 7412 -7413  7414  1023 -7415 0
 7412 -7413  7414  1023 -7416 0
 7412 -7413  7414  1023  7417 0

c  1-1 --> 0
c    (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0 ∧ -p_1023) -> (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧ -b^{3, 342}_0)
c  in CNF:
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_2
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_1
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_0
c  in DIMACS:
 7412  7413 -7414  1023 -7415 0
 7412  7413 -7414  1023 -7416 0
 7412  7413 -7414  1023 -7417 0

c  0-1 --> -1
c    (-b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧ -p_1023) -> ( b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0)
c  in CNF:
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨  b^{3, 342}_2
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_1
c     b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨  b^{3, 342}_0
c  in DIMACS:
 7412  7413  7414  1023  7415 0
 7412  7413  7414  1023 -7416 0
 7412  7413  7414  1023  7417 0

c  -1-1 --> -2
c    ( b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧  b^{3, 341}_0 ∧ -p_1023) -> ( b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0)
c  in CNF:
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨  b^{3, 342}_2
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨  b^{3, 342}_1
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨  p_1023 ∨ -b^{3, 342}_0
c  in DIMACS:
-7412  7413 -7414  1023  7415 0
-7412  7413 -7414  1023  7416 0
-7412  7413 -7414  1023 -7417 0

c  -2-1 --> break 
c    ( b^{3, 341}_2 ∧  b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨  b^{3, 341}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-7412 -7413  7414  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 341}_2 ∧ -b^{3, 341}_1 ∧ -b^{3, 341}_0 ∧ true) 
c  in CNF:
c    -b^{3, 341}_2 ∨  b^{3, 341}_1 ∨  b^{3, 341}_0 ∨ false 
c  in DIMACS:
-7412  7413  7414  0

c  3 does not represent an automaton state.
c    -(-b^{3, 341}_2 ∧  b^{3, 341}_1 ∧  b^{3, 341}_0 ∧ true) 
c  in CNF:
c     b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ false 
c  in DIMACS:
 7412 -7413 -7414  0
c  -3 does not represent an automaton state.
c    -( b^{3, 341}_2 ∧  b^{3, 341}_1 ∧  b^{3, 341}_0 ∧ true) 
c  in CNF:
c    -b^{3, 341}_2 ∨ -b^{3, 341}_1 ∨ -b^{3, 341}_0 ∨ false 
c  in DIMACS:
-7412 -7413 -7414  0

c i = 342
c  -2+1 --> -1
c    ( b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧  p_1026) -> ( b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0)
c  in CNF:
c    -b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨  b^{3, 343}_2
c    -b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_1
c    -b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨  b^{3, 343}_0
c  in DIMACS:
-7415 -7416  7417 -1026  7418 0
-7415 -7416  7417 -1026 -7419 0
-7415 -7416  7417 -1026  7420 0

c  -1+1 --> 0
c    ( b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0 ∧  p_1026) -> (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧ -b^{3, 343}_0)
c  in CNF:
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_2
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_1
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_0
c  in DIMACS:
-7415  7416 -7417 -1026 -7418 0
-7415  7416 -7417 -1026 -7419 0
-7415  7416 -7417 -1026 -7420 0

c  0+1 --> 1
c    (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧  p_1026) -> (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0)
c  in CNF:
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_2
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_1
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨  b^{3, 343}_0
c  in DIMACS:
 7415  7416  7417 -1026 -7418 0
 7415  7416  7417 -1026 -7419 0
 7415  7416  7417 -1026  7420 0

c  1+1 --> 2
c    (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0 ∧  p_1026) -> (-b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0)
c  in CNF:
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_2
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨  b^{3, 343}_1
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ -p_1026 ∨ -b^{3, 343}_0
c  in DIMACS:
 7415  7416 -7417 -1026 -7418 0
 7415  7416 -7417 -1026  7419 0
 7415  7416 -7417 -1026 -7420 0

c  2+1 --> break 
c    (-b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 7415 -7416  7417 -1026 1162 0


c  2-1 --> 1
c    (-b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧ -p_1026) -> (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0)
c  in CNF:
c     b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_2
c     b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_1
c     b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨  b^{3, 343}_0
c  in DIMACS:
 7415 -7416  7417  1026 -7418 0
 7415 -7416  7417  1026 -7419 0
 7415 -7416  7417  1026  7420 0

c  1-1 --> 0
c    (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0 ∧ -p_1026) -> (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧ -b^{3, 343}_0)
c  in CNF:
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_2
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_1
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_0
c  in DIMACS:
 7415  7416 -7417  1026 -7418 0
 7415  7416 -7417  1026 -7419 0
 7415  7416 -7417  1026 -7420 0

c  0-1 --> -1
c    (-b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧ -p_1026) -> ( b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0)
c  in CNF:
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨  b^{3, 343}_2
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_1
c     b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨  b^{3, 343}_0
c  in DIMACS:
 7415  7416  7417  1026  7418 0
 7415  7416  7417  1026 -7419 0
 7415  7416  7417  1026  7420 0

c  -1-1 --> -2
c    ( b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧  b^{3, 342}_0 ∧ -p_1026) -> ( b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0)
c  in CNF:
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨  b^{3, 343}_2
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨  b^{3, 343}_1
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨  p_1026 ∨ -b^{3, 343}_0
c  in DIMACS:
-7415  7416 -7417  1026  7418 0
-7415  7416 -7417  1026  7419 0
-7415  7416 -7417  1026 -7420 0

c  -2-1 --> break 
c    ( b^{3, 342}_2 ∧  b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨  b^{3, 342}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-7415 -7416  7417  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 342}_2 ∧ -b^{3, 342}_1 ∧ -b^{3, 342}_0 ∧ true) 
c  in CNF:
c    -b^{3, 342}_2 ∨  b^{3, 342}_1 ∨  b^{3, 342}_0 ∨ false 
c  in DIMACS:
-7415  7416  7417  0

c  3 does not represent an automaton state.
c    -(-b^{3, 342}_2 ∧  b^{3, 342}_1 ∧  b^{3, 342}_0 ∧ true) 
c  in CNF:
c     b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ false 
c  in DIMACS:
 7415 -7416 -7417  0
c  -3 does not represent an automaton state.
c    -( b^{3, 342}_2 ∧  b^{3, 342}_1 ∧  b^{3, 342}_0 ∧ true) 
c  in CNF:
c    -b^{3, 342}_2 ∨ -b^{3, 342}_1 ∨ -b^{3, 342}_0 ∨ false 
c  in DIMACS:
-7415 -7416 -7417  0

c i = 343
c  -2+1 --> -1
c    ( b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧  p_1029) -> ( b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0)
c  in CNF:
c    -b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨  b^{3, 344}_2
c    -b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_1
c    -b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨  b^{3, 344}_0
c  in DIMACS:
-7418 -7419  7420 -1029  7421 0
-7418 -7419  7420 -1029 -7422 0
-7418 -7419  7420 -1029  7423 0

c  -1+1 --> 0
c    ( b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0 ∧  p_1029) -> (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧ -b^{3, 344}_0)
c  in CNF:
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_2
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_1
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_0
c  in DIMACS:
-7418  7419 -7420 -1029 -7421 0
-7418  7419 -7420 -1029 -7422 0
-7418  7419 -7420 -1029 -7423 0

c  0+1 --> 1
c    (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧  p_1029) -> (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0)
c  in CNF:
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_2
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_1
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨  b^{3, 344}_0
c  in DIMACS:
 7418  7419  7420 -1029 -7421 0
 7418  7419  7420 -1029 -7422 0
 7418  7419  7420 -1029  7423 0

c  1+1 --> 2
c    (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0 ∧  p_1029) -> (-b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0)
c  in CNF:
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_2
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨  b^{3, 344}_1
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ -p_1029 ∨ -b^{3, 344}_0
c  in DIMACS:
 7418  7419 -7420 -1029 -7421 0
 7418  7419 -7420 -1029  7422 0
 7418  7419 -7420 -1029 -7423 0

c  2+1 --> break 
c    (-b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 7418 -7419  7420 -1029 1162 0


c  2-1 --> 1
c    (-b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧ -p_1029) -> (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0)
c  in CNF:
c     b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_2
c     b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_1
c     b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨  b^{3, 344}_0
c  in DIMACS:
 7418 -7419  7420  1029 -7421 0
 7418 -7419  7420  1029 -7422 0
 7418 -7419  7420  1029  7423 0

c  1-1 --> 0
c    (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0 ∧ -p_1029) -> (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧ -b^{3, 344}_0)
c  in CNF:
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_2
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_1
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_0
c  in DIMACS:
 7418  7419 -7420  1029 -7421 0
 7418  7419 -7420  1029 -7422 0
 7418  7419 -7420  1029 -7423 0

c  0-1 --> -1
c    (-b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧ -p_1029) -> ( b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0)
c  in CNF:
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨  b^{3, 344}_2
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_1
c     b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨  b^{3, 344}_0
c  in DIMACS:
 7418  7419  7420  1029  7421 0
 7418  7419  7420  1029 -7422 0
 7418  7419  7420  1029  7423 0

c  -1-1 --> -2
c    ( b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧  b^{3, 343}_0 ∧ -p_1029) -> ( b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0)
c  in CNF:
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨  b^{3, 344}_2
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨  b^{3, 344}_1
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨  p_1029 ∨ -b^{3, 344}_0
c  in DIMACS:
-7418  7419 -7420  1029  7421 0
-7418  7419 -7420  1029  7422 0
-7418  7419 -7420  1029 -7423 0

c  -2-1 --> break 
c    ( b^{3, 343}_2 ∧  b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨  b^{3, 343}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-7418 -7419  7420  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 343}_2 ∧ -b^{3, 343}_1 ∧ -b^{3, 343}_0 ∧ true) 
c  in CNF:
c    -b^{3, 343}_2 ∨  b^{3, 343}_1 ∨  b^{3, 343}_0 ∨ false 
c  in DIMACS:
-7418  7419  7420  0

c  3 does not represent an automaton state.
c    -(-b^{3, 343}_2 ∧  b^{3, 343}_1 ∧  b^{3, 343}_0 ∧ true) 
c  in CNF:
c     b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ false 
c  in DIMACS:
 7418 -7419 -7420  0
c  -3 does not represent an automaton state.
c    -( b^{3, 343}_2 ∧  b^{3, 343}_1 ∧  b^{3, 343}_0 ∧ true) 
c  in CNF:
c    -b^{3, 343}_2 ∨ -b^{3, 343}_1 ∨ -b^{3, 343}_0 ∨ false 
c  in DIMACS:
-7418 -7419 -7420  0

c i = 344
c  -2+1 --> -1
c    ( b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧  p_1032) -> ( b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0)
c  in CNF:
c    -b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨  b^{3, 345}_2
c    -b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_1
c    -b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨  b^{3, 345}_0
c  in DIMACS:
-7421 -7422  7423 -1032  7424 0
-7421 -7422  7423 -1032 -7425 0
-7421 -7422  7423 -1032  7426 0

c  -1+1 --> 0
c    ( b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0 ∧  p_1032) -> (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧ -b^{3, 345}_0)
c  in CNF:
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_2
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_1
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_0
c  in DIMACS:
-7421  7422 -7423 -1032 -7424 0
-7421  7422 -7423 -1032 -7425 0
-7421  7422 -7423 -1032 -7426 0

c  0+1 --> 1
c    (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧  p_1032) -> (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0)
c  in CNF:
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_2
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_1
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨  b^{3, 345}_0
c  in DIMACS:
 7421  7422  7423 -1032 -7424 0
 7421  7422  7423 -1032 -7425 0
 7421  7422  7423 -1032  7426 0

c  1+1 --> 2
c    (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0 ∧  p_1032) -> (-b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0)
c  in CNF:
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_2
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨  b^{3, 345}_1
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ -p_1032 ∨ -b^{3, 345}_0
c  in DIMACS:
 7421  7422 -7423 -1032 -7424 0
 7421  7422 -7423 -1032  7425 0
 7421  7422 -7423 -1032 -7426 0

c  2+1 --> break 
c    (-b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 7421 -7422  7423 -1032 1162 0


c  2-1 --> 1
c    (-b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧ -p_1032) -> (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0)
c  in CNF:
c     b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_2
c     b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_1
c     b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨  b^{3, 345}_0
c  in DIMACS:
 7421 -7422  7423  1032 -7424 0
 7421 -7422  7423  1032 -7425 0
 7421 -7422  7423  1032  7426 0

c  1-1 --> 0
c    (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0 ∧ -p_1032) -> (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧ -b^{3, 345}_0)
c  in CNF:
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_2
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_1
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_0
c  in DIMACS:
 7421  7422 -7423  1032 -7424 0
 7421  7422 -7423  1032 -7425 0
 7421  7422 -7423  1032 -7426 0

c  0-1 --> -1
c    (-b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧ -p_1032) -> ( b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0)
c  in CNF:
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨  b^{3, 345}_2
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_1
c     b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨  b^{3, 345}_0
c  in DIMACS:
 7421  7422  7423  1032  7424 0
 7421  7422  7423  1032 -7425 0
 7421  7422  7423  1032  7426 0

c  -1-1 --> -2
c    ( b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧  b^{3, 344}_0 ∧ -p_1032) -> ( b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0)
c  in CNF:
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨  b^{3, 345}_2
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨  b^{3, 345}_1
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨  p_1032 ∨ -b^{3, 345}_0
c  in DIMACS:
-7421  7422 -7423  1032  7424 0
-7421  7422 -7423  1032  7425 0
-7421  7422 -7423  1032 -7426 0

c  -2-1 --> break 
c    ( b^{3, 344}_2 ∧  b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨  b^{3, 344}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-7421 -7422  7423  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 344}_2 ∧ -b^{3, 344}_1 ∧ -b^{3, 344}_0 ∧ true) 
c  in CNF:
c    -b^{3, 344}_2 ∨  b^{3, 344}_1 ∨  b^{3, 344}_0 ∨ false 
c  in DIMACS:
-7421  7422  7423  0

c  3 does not represent an automaton state.
c    -(-b^{3, 344}_2 ∧  b^{3, 344}_1 ∧  b^{3, 344}_0 ∧ true) 
c  in CNF:
c     b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ false 
c  in DIMACS:
 7421 -7422 -7423  0
c  -3 does not represent an automaton state.
c    -( b^{3, 344}_2 ∧  b^{3, 344}_1 ∧  b^{3, 344}_0 ∧ true) 
c  in CNF:
c    -b^{3, 344}_2 ∨ -b^{3, 344}_1 ∨ -b^{3, 344}_0 ∨ false 
c  in DIMACS:
-7421 -7422 -7423  0

c i = 345
c  -2+1 --> -1
c    ( b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧  p_1035) -> ( b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0)
c  in CNF:
c    -b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨  b^{3, 346}_2
c    -b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_1
c    -b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨  b^{3, 346}_0
c  in DIMACS:
-7424 -7425  7426 -1035  7427 0
-7424 -7425  7426 -1035 -7428 0
-7424 -7425  7426 -1035  7429 0

c  -1+1 --> 0
c    ( b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0 ∧  p_1035) -> (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧ -b^{3, 346}_0)
c  in CNF:
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_2
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_1
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_0
c  in DIMACS:
-7424  7425 -7426 -1035 -7427 0
-7424  7425 -7426 -1035 -7428 0
-7424  7425 -7426 -1035 -7429 0

c  0+1 --> 1
c    (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧  p_1035) -> (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0)
c  in CNF:
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_2
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_1
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨  b^{3, 346}_0
c  in DIMACS:
 7424  7425  7426 -1035 -7427 0
 7424  7425  7426 -1035 -7428 0
 7424  7425  7426 -1035  7429 0

c  1+1 --> 2
c    (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0 ∧  p_1035) -> (-b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0)
c  in CNF:
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_2
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨  b^{3, 346}_1
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ -p_1035 ∨ -b^{3, 346}_0
c  in DIMACS:
 7424  7425 -7426 -1035 -7427 0
 7424  7425 -7426 -1035  7428 0
 7424  7425 -7426 -1035 -7429 0

c  2+1 --> break 
c    (-b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 7424 -7425  7426 -1035 1162 0


c  2-1 --> 1
c    (-b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧ -p_1035) -> (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0)
c  in CNF:
c     b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_2
c     b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_1
c     b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨  b^{3, 346}_0
c  in DIMACS:
 7424 -7425  7426  1035 -7427 0
 7424 -7425  7426  1035 -7428 0
 7424 -7425  7426  1035  7429 0

c  1-1 --> 0
c    (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0 ∧ -p_1035) -> (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧ -b^{3, 346}_0)
c  in CNF:
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_2
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_1
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_0
c  in DIMACS:
 7424  7425 -7426  1035 -7427 0
 7424  7425 -7426  1035 -7428 0
 7424  7425 -7426  1035 -7429 0

c  0-1 --> -1
c    (-b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧ -p_1035) -> ( b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0)
c  in CNF:
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨  b^{3, 346}_2
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_1
c     b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨  b^{3, 346}_0
c  in DIMACS:
 7424  7425  7426  1035  7427 0
 7424  7425  7426  1035 -7428 0
 7424  7425  7426  1035  7429 0

c  -1-1 --> -2
c    ( b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧  b^{3, 345}_0 ∧ -p_1035) -> ( b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0)
c  in CNF:
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨  b^{3, 346}_2
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨  b^{3, 346}_1
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨  p_1035 ∨ -b^{3, 346}_0
c  in DIMACS:
-7424  7425 -7426  1035  7427 0
-7424  7425 -7426  1035  7428 0
-7424  7425 -7426  1035 -7429 0

c  -2-1 --> break 
c    ( b^{3, 345}_2 ∧  b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨  b^{3, 345}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-7424 -7425  7426  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 345}_2 ∧ -b^{3, 345}_1 ∧ -b^{3, 345}_0 ∧ true) 
c  in CNF:
c    -b^{3, 345}_2 ∨  b^{3, 345}_1 ∨  b^{3, 345}_0 ∨ false 
c  in DIMACS:
-7424  7425  7426  0

c  3 does not represent an automaton state.
c    -(-b^{3, 345}_2 ∧  b^{3, 345}_1 ∧  b^{3, 345}_0 ∧ true) 
c  in CNF:
c     b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ false 
c  in DIMACS:
 7424 -7425 -7426  0
c  -3 does not represent an automaton state.
c    -( b^{3, 345}_2 ∧  b^{3, 345}_1 ∧  b^{3, 345}_0 ∧ true) 
c  in CNF:
c    -b^{3, 345}_2 ∨ -b^{3, 345}_1 ∨ -b^{3, 345}_0 ∨ false 
c  in DIMACS:
-7424 -7425 -7426  0

c i = 346
c  -2+1 --> -1
c    ( b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧  p_1038) -> ( b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0)
c  in CNF:
c    -b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨  b^{3, 347}_2
c    -b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_1
c    -b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨  b^{3, 347}_0
c  in DIMACS:
-7427 -7428  7429 -1038  7430 0
-7427 -7428  7429 -1038 -7431 0
-7427 -7428  7429 -1038  7432 0

c  -1+1 --> 0
c    ( b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0 ∧  p_1038) -> (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧ -b^{3, 347}_0)
c  in CNF:
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_2
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_1
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_0
c  in DIMACS:
-7427  7428 -7429 -1038 -7430 0
-7427  7428 -7429 -1038 -7431 0
-7427  7428 -7429 -1038 -7432 0

c  0+1 --> 1
c    (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧  p_1038) -> (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0)
c  in CNF:
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_2
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_1
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨  b^{3, 347}_0
c  in DIMACS:
 7427  7428  7429 -1038 -7430 0
 7427  7428  7429 -1038 -7431 0
 7427  7428  7429 -1038  7432 0

c  1+1 --> 2
c    (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0 ∧  p_1038) -> (-b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0)
c  in CNF:
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_2
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨  b^{3, 347}_1
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ -p_1038 ∨ -b^{3, 347}_0
c  in DIMACS:
 7427  7428 -7429 -1038 -7430 0
 7427  7428 -7429 -1038  7431 0
 7427  7428 -7429 -1038 -7432 0

c  2+1 --> break 
c    (-b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 7427 -7428  7429 -1038 1162 0


c  2-1 --> 1
c    (-b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧ -p_1038) -> (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0)
c  in CNF:
c     b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_2
c     b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_1
c     b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨  b^{3, 347}_0
c  in DIMACS:
 7427 -7428  7429  1038 -7430 0
 7427 -7428  7429  1038 -7431 0
 7427 -7428  7429  1038  7432 0

c  1-1 --> 0
c    (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0 ∧ -p_1038) -> (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧ -b^{3, 347}_0)
c  in CNF:
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_2
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_1
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_0
c  in DIMACS:
 7427  7428 -7429  1038 -7430 0
 7427  7428 -7429  1038 -7431 0
 7427  7428 -7429  1038 -7432 0

c  0-1 --> -1
c    (-b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧ -p_1038) -> ( b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0)
c  in CNF:
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨  b^{3, 347}_2
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_1
c     b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨  b^{3, 347}_0
c  in DIMACS:
 7427  7428  7429  1038  7430 0
 7427  7428  7429  1038 -7431 0
 7427  7428  7429  1038  7432 0

c  -1-1 --> -2
c    ( b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧  b^{3, 346}_0 ∧ -p_1038) -> ( b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0)
c  in CNF:
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨  b^{3, 347}_2
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨  b^{3, 347}_1
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨  p_1038 ∨ -b^{3, 347}_0
c  in DIMACS:
-7427  7428 -7429  1038  7430 0
-7427  7428 -7429  1038  7431 0
-7427  7428 -7429  1038 -7432 0

c  -2-1 --> break 
c    ( b^{3, 346}_2 ∧  b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨  b^{3, 346}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-7427 -7428  7429  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 346}_2 ∧ -b^{3, 346}_1 ∧ -b^{3, 346}_0 ∧ true) 
c  in CNF:
c    -b^{3, 346}_2 ∨  b^{3, 346}_1 ∨  b^{3, 346}_0 ∨ false 
c  in DIMACS:
-7427  7428  7429  0

c  3 does not represent an automaton state.
c    -(-b^{3, 346}_2 ∧  b^{3, 346}_1 ∧  b^{3, 346}_0 ∧ true) 
c  in CNF:
c     b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ false 
c  in DIMACS:
 7427 -7428 -7429  0
c  -3 does not represent an automaton state.
c    -( b^{3, 346}_2 ∧  b^{3, 346}_1 ∧  b^{3, 346}_0 ∧ true) 
c  in CNF:
c    -b^{3, 346}_2 ∨ -b^{3, 346}_1 ∨ -b^{3, 346}_0 ∨ false 
c  in DIMACS:
-7427 -7428 -7429  0

c i = 347
c  -2+1 --> -1
c    ( b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧  p_1041) -> ( b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0)
c  in CNF:
c    -b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨  b^{3, 348}_2
c    -b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_1
c    -b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨  b^{3, 348}_0
c  in DIMACS:
-7430 -7431  7432 -1041  7433 0
-7430 -7431  7432 -1041 -7434 0
-7430 -7431  7432 -1041  7435 0

c  -1+1 --> 0
c    ( b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0 ∧  p_1041) -> (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧ -b^{3, 348}_0)
c  in CNF:
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_2
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_1
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_0
c  in DIMACS:
-7430  7431 -7432 -1041 -7433 0
-7430  7431 -7432 -1041 -7434 0
-7430  7431 -7432 -1041 -7435 0

c  0+1 --> 1
c    (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧  p_1041) -> (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0)
c  in CNF:
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_2
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_1
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨  b^{3, 348}_0
c  in DIMACS:
 7430  7431  7432 -1041 -7433 0
 7430  7431  7432 -1041 -7434 0
 7430  7431  7432 -1041  7435 0

c  1+1 --> 2
c    (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0 ∧  p_1041) -> (-b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0)
c  in CNF:
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_2
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨  b^{3, 348}_1
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ -p_1041 ∨ -b^{3, 348}_0
c  in DIMACS:
 7430  7431 -7432 -1041 -7433 0
 7430  7431 -7432 -1041  7434 0
 7430  7431 -7432 -1041 -7435 0

c  2+1 --> break 
c    (-b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧  p_1041) -> break
c  in CNF:
c     b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ -p_1041 ∨ break
c  in DIMACS:
 7430 -7431  7432 -1041 1162 0


c  2-1 --> 1
c    (-b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧ -p_1041) -> (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0)
c  in CNF:
c     b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_2
c     b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_1
c     b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨  b^{3, 348}_0
c  in DIMACS:
 7430 -7431  7432  1041 -7433 0
 7430 -7431  7432  1041 -7434 0
 7430 -7431  7432  1041  7435 0

c  1-1 --> 0
c    (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0 ∧ -p_1041) -> (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧ -b^{3, 348}_0)
c  in CNF:
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_2
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_1
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_0
c  in DIMACS:
 7430  7431 -7432  1041 -7433 0
 7430  7431 -7432  1041 -7434 0
 7430  7431 -7432  1041 -7435 0

c  0-1 --> -1
c    (-b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧ -p_1041) -> ( b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0)
c  in CNF:
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨  b^{3, 348}_2
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_1
c     b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨  b^{3, 348}_0
c  in DIMACS:
 7430  7431  7432  1041  7433 0
 7430  7431  7432  1041 -7434 0
 7430  7431  7432  1041  7435 0

c  -1-1 --> -2
c    ( b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧  b^{3, 347}_0 ∧ -p_1041) -> ( b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0)
c  in CNF:
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨  b^{3, 348}_2
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨  b^{3, 348}_1
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨  p_1041 ∨ -b^{3, 348}_0
c  in DIMACS:
-7430  7431 -7432  1041  7433 0
-7430  7431 -7432  1041  7434 0
-7430  7431 -7432  1041 -7435 0

c  -2-1 --> break 
c    ( b^{3, 347}_2 ∧  b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧ -p_1041) -> break
c  in CNF:
c    -b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨  b^{3, 347}_0 ∨  p_1041 ∨ break
c  in DIMACS:
-7430 -7431  7432  1041 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 347}_2 ∧ -b^{3, 347}_1 ∧ -b^{3, 347}_0 ∧ true) 
c  in CNF:
c    -b^{3, 347}_2 ∨  b^{3, 347}_1 ∨  b^{3, 347}_0 ∨ false 
c  in DIMACS:
-7430  7431  7432  0

c  3 does not represent an automaton state.
c    -(-b^{3, 347}_2 ∧  b^{3, 347}_1 ∧  b^{3, 347}_0 ∧ true) 
c  in CNF:
c     b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ false 
c  in DIMACS:
 7430 -7431 -7432  0
c  -3 does not represent an automaton state.
c    -( b^{3, 347}_2 ∧  b^{3, 347}_1 ∧  b^{3, 347}_0 ∧ true) 
c  in CNF:
c    -b^{3, 347}_2 ∨ -b^{3, 347}_1 ∨ -b^{3, 347}_0 ∨ false 
c  in DIMACS:
-7430 -7431 -7432  0

c i = 348
c  -2+1 --> -1
c    ( b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧  p_1044) -> ( b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0)
c  in CNF:
c    -b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨  b^{3, 349}_2
c    -b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_1
c    -b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨  b^{3, 349}_0
c  in DIMACS:
-7433 -7434  7435 -1044  7436 0
-7433 -7434  7435 -1044 -7437 0
-7433 -7434  7435 -1044  7438 0

c  -1+1 --> 0
c    ( b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0 ∧  p_1044) -> (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧ -b^{3, 349}_0)
c  in CNF:
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_2
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_1
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_0
c  in DIMACS:
-7433  7434 -7435 -1044 -7436 0
-7433  7434 -7435 -1044 -7437 0
-7433  7434 -7435 -1044 -7438 0

c  0+1 --> 1
c    (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧  p_1044) -> (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0)
c  in CNF:
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_2
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_1
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨  b^{3, 349}_0
c  in DIMACS:
 7433  7434  7435 -1044 -7436 0
 7433  7434  7435 -1044 -7437 0
 7433  7434  7435 -1044  7438 0

c  1+1 --> 2
c    (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0 ∧  p_1044) -> (-b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0)
c  in CNF:
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_2
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨  b^{3, 349}_1
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ -p_1044 ∨ -b^{3, 349}_0
c  in DIMACS:
 7433  7434 -7435 -1044 -7436 0
 7433  7434 -7435 -1044  7437 0
 7433  7434 -7435 -1044 -7438 0

c  2+1 --> break 
c    (-b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 7433 -7434  7435 -1044 1162 0


c  2-1 --> 1
c    (-b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧ -p_1044) -> (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0)
c  in CNF:
c     b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_2
c     b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_1
c     b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨  b^{3, 349}_0
c  in DIMACS:
 7433 -7434  7435  1044 -7436 0
 7433 -7434  7435  1044 -7437 0
 7433 -7434  7435  1044  7438 0

c  1-1 --> 0
c    (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0 ∧ -p_1044) -> (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧ -b^{3, 349}_0)
c  in CNF:
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_2
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_1
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_0
c  in DIMACS:
 7433  7434 -7435  1044 -7436 0
 7433  7434 -7435  1044 -7437 0
 7433  7434 -7435  1044 -7438 0

c  0-1 --> -1
c    (-b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧ -p_1044) -> ( b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0)
c  in CNF:
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨  b^{3, 349}_2
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_1
c     b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨  b^{3, 349}_0
c  in DIMACS:
 7433  7434  7435  1044  7436 0
 7433  7434  7435  1044 -7437 0
 7433  7434  7435  1044  7438 0

c  -1-1 --> -2
c    ( b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧  b^{3, 348}_0 ∧ -p_1044) -> ( b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0)
c  in CNF:
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨  b^{3, 349}_2
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨  b^{3, 349}_1
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨  p_1044 ∨ -b^{3, 349}_0
c  in DIMACS:
-7433  7434 -7435  1044  7436 0
-7433  7434 -7435  1044  7437 0
-7433  7434 -7435  1044 -7438 0

c  -2-1 --> break 
c    ( b^{3, 348}_2 ∧  b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨  b^{3, 348}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-7433 -7434  7435  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 348}_2 ∧ -b^{3, 348}_1 ∧ -b^{3, 348}_0 ∧ true) 
c  in CNF:
c    -b^{3, 348}_2 ∨  b^{3, 348}_1 ∨  b^{3, 348}_0 ∨ false 
c  in DIMACS:
-7433  7434  7435  0

c  3 does not represent an automaton state.
c    -(-b^{3, 348}_2 ∧  b^{3, 348}_1 ∧  b^{3, 348}_0 ∧ true) 
c  in CNF:
c     b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ false 
c  in DIMACS:
 7433 -7434 -7435  0
c  -3 does not represent an automaton state.
c    -( b^{3, 348}_2 ∧  b^{3, 348}_1 ∧  b^{3, 348}_0 ∧ true) 
c  in CNF:
c    -b^{3, 348}_2 ∨ -b^{3, 348}_1 ∨ -b^{3, 348}_0 ∨ false 
c  in DIMACS:
-7433 -7434 -7435  0

c i = 349
c  -2+1 --> -1
c    ( b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧  p_1047) -> ( b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0)
c  in CNF:
c    -b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨  b^{3, 350}_2
c    -b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_1
c    -b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨  b^{3, 350}_0
c  in DIMACS:
-7436 -7437  7438 -1047  7439 0
-7436 -7437  7438 -1047 -7440 0
-7436 -7437  7438 -1047  7441 0

c  -1+1 --> 0
c    ( b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0 ∧  p_1047) -> (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧ -b^{3, 350}_0)
c  in CNF:
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_2
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_1
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_0
c  in DIMACS:
-7436  7437 -7438 -1047 -7439 0
-7436  7437 -7438 -1047 -7440 0
-7436  7437 -7438 -1047 -7441 0

c  0+1 --> 1
c    (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧  p_1047) -> (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0)
c  in CNF:
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_2
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_1
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨  b^{3, 350}_0
c  in DIMACS:
 7436  7437  7438 -1047 -7439 0
 7436  7437  7438 -1047 -7440 0
 7436  7437  7438 -1047  7441 0

c  1+1 --> 2
c    (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0 ∧  p_1047) -> (-b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0)
c  in CNF:
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_2
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨  b^{3, 350}_1
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ -p_1047 ∨ -b^{3, 350}_0
c  in DIMACS:
 7436  7437 -7438 -1047 -7439 0
 7436  7437 -7438 -1047  7440 0
 7436  7437 -7438 -1047 -7441 0

c  2+1 --> break 
c    (-b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧  p_1047) -> break
c  in CNF:
c     b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ -p_1047 ∨ break
c  in DIMACS:
 7436 -7437  7438 -1047 1162 0


c  2-1 --> 1
c    (-b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧ -p_1047) -> (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0)
c  in CNF:
c     b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_2
c     b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_1
c     b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨  b^{3, 350}_0
c  in DIMACS:
 7436 -7437  7438  1047 -7439 0
 7436 -7437  7438  1047 -7440 0
 7436 -7437  7438  1047  7441 0

c  1-1 --> 0
c    (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0 ∧ -p_1047) -> (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧ -b^{3, 350}_0)
c  in CNF:
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_2
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_1
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_0
c  in DIMACS:
 7436  7437 -7438  1047 -7439 0
 7436  7437 -7438  1047 -7440 0
 7436  7437 -7438  1047 -7441 0

c  0-1 --> -1
c    (-b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧ -p_1047) -> ( b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0)
c  in CNF:
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨  b^{3, 350}_2
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_1
c     b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨  b^{3, 350}_0
c  in DIMACS:
 7436  7437  7438  1047  7439 0
 7436  7437  7438  1047 -7440 0
 7436  7437  7438  1047  7441 0

c  -1-1 --> -2
c    ( b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧  b^{3, 349}_0 ∧ -p_1047) -> ( b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0)
c  in CNF:
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨  b^{3, 350}_2
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨  b^{3, 350}_1
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨  p_1047 ∨ -b^{3, 350}_0
c  in DIMACS:
-7436  7437 -7438  1047  7439 0
-7436  7437 -7438  1047  7440 0
-7436  7437 -7438  1047 -7441 0

c  -2-1 --> break 
c    ( b^{3, 349}_2 ∧  b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧ -p_1047) -> break
c  in CNF:
c    -b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨  b^{3, 349}_0 ∨  p_1047 ∨ break
c  in DIMACS:
-7436 -7437  7438  1047 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 349}_2 ∧ -b^{3, 349}_1 ∧ -b^{3, 349}_0 ∧ true) 
c  in CNF:
c    -b^{3, 349}_2 ∨  b^{3, 349}_1 ∨  b^{3, 349}_0 ∨ false 
c  in DIMACS:
-7436  7437  7438  0

c  3 does not represent an automaton state.
c    -(-b^{3, 349}_2 ∧  b^{3, 349}_1 ∧  b^{3, 349}_0 ∧ true) 
c  in CNF:
c     b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ false 
c  in DIMACS:
 7436 -7437 -7438  0
c  -3 does not represent an automaton state.
c    -( b^{3, 349}_2 ∧  b^{3, 349}_1 ∧  b^{3, 349}_0 ∧ true) 
c  in CNF:
c    -b^{3, 349}_2 ∨ -b^{3, 349}_1 ∨ -b^{3, 349}_0 ∨ false 
c  in DIMACS:
-7436 -7437 -7438  0

c i = 350
c  -2+1 --> -1
c    ( b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧  p_1050) -> ( b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0)
c  in CNF:
c    -b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨  b^{3, 351}_2
c    -b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_1
c    -b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨  b^{3, 351}_0
c  in DIMACS:
-7439 -7440  7441 -1050  7442 0
-7439 -7440  7441 -1050 -7443 0
-7439 -7440  7441 -1050  7444 0

c  -1+1 --> 0
c    ( b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0 ∧  p_1050) -> (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧ -b^{3, 351}_0)
c  in CNF:
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_2
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_1
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_0
c  in DIMACS:
-7439  7440 -7441 -1050 -7442 0
-7439  7440 -7441 -1050 -7443 0
-7439  7440 -7441 -1050 -7444 0

c  0+1 --> 1
c    (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧  p_1050) -> (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0)
c  in CNF:
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_2
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_1
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨  b^{3, 351}_0
c  in DIMACS:
 7439  7440  7441 -1050 -7442 0
 7439  7440  7441 -1050 -7443 0
 7439  7440  7441 -1050  7444 0

c  1+1 --> 2
c    (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0 ∧  p_1050) -> (-b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0)
c  in CNF:
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_2
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨  b^{3, 351}_1
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ -p_1050 ∨ -b^{3, 351}_0
c  in DIMACS:
 7439  7440 -7441 -1050 -7442 0
 7439  7440 -7441 -1050  7443 0
 7439  7440 -7441 -1050 -7444 0

c  2+1 --> break 
c    (-b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 7439 -7440  7441 -1050 1162 0


c  2-1 --> 1
c    (-b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧ -p_1050) -> (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0)
c  in CNF:
c     b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_2
c     b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_1
c     b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨  b^{3, 351}_0
c  in DIMACS:
 7439 -7440  7441  1050 -7442 0
 7439 -7440  7441  1050 -7443 0
 7439 -7440  7441  1050  7444 0

c  1-1 --> 0
c    (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0 ∧ -p_1050) -> (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧ -b^{3, 351}_0)
c  in CNF:
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_2
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_1
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_0
c  in DIMACS:
 7439  7440 -7441  1050 -7442 0
 7439  7440 -7441  1050 -7443 0
 7439  7440 -7441  1050 -7444 0

c  0-1 --> -1
c    (-b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧ -p_1050) -> ( b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0)
c  in CNF:
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨  b^{3, 351}_2
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_1
c     b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨  b^{3, 351}_0
c  in DIMACS:
 7439  7440  7441  1050  7442 0
 7439  7440  7441  1050 -7443 0
 7439  7440  7441  1050  7444 0

c  -1-1 --> -2
c    ( b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧  b^{3, 350}_0 ∧ -p_1050) -> ( b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0)
c  in CNF:
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨  b^{3, 351}_2
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨  b^{3, 351}_1
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨  p_1050 ∨ -b^{3, 351}_0
c  in DIMACS:
-7439  7440 -7441  1050  7442 0
-7439  7440 -7441  1050  7443 0
-7439  7440 -7441  1050 -7444 0

c  -2-1 --> break 
c    ( b^{3, 350}_2 ∧  b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨  b^{3, 350}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-7439 -7440  7441  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 350}_2 ∧ -b^{3, 350}_1 ∧ -b^{3, 350}_0 ∧ true) 
c  in CNF:
c    -b^{3, 350}_2 ∨  b^{3, 350}_1 ∨  b^{3, 350}_0 ∨ false 
c  in DIMACS:
-7439  7440  7441  0

c  3 does not represent an automaton state.
c    -(-b^{3, 350}_2 ∧  b^{3, 350}_1 ∧  b^{3, 350}_0 ∧ true) 
c  in CNF:
c     b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ false 
c  in DIMACS:
 7439 -7440 -7441  0
c  -3 does not represent an automaton state.
c    -( b^{3, 350}_2 ∧  b^{3, 350}_1 ∧  b^{3, 350}_0 ∧ true) 
c  in CNF:
c    -b^{3, 350}_2 ∨ -b^{3, 350}_1 ∨ -b^{3, 350}_0 ∨ false 
c  in DIMACS:
-7439 -7440 -7441  0

c i = 351
c  -2+1 --> -1
c    ( b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧  p_1053) -> ( b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0)
c  in CNF:
c    -b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨  b^{3, 352}_2
c    -b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_1
c    -b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨  b^{3, 352}_0
c  in DIMACS:
-7442 -7443  7444 -1053  7445 0
-7442 -7443  7444 -1053 -7446 0
-7442 -7443  7444 -1053  7447 0

c  -1+1 --> 0
c    ( b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0 ∧  p_1053) -> (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧ -b^{3, 352}_0)
c  in CNF:
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_2
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_1
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_0
c  in DIMACS:
-7442  7443 -7444 -1053 -7445 0
-7442  7443 -7444 -1053 -7446 0
-7442  7443 -7444 -1053 -7447 0

c  0+1 --> 1
c    (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧  p_1053) -> (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0)
c  in CNF:
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_2
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_1
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨  b^{3, 352}_0
c  in DIMACS:
 7442  7443  7444 -1053 -7445 0
 7442  7443  7444 -1053 -7446 0
 7442  7443  7444 -1053  7447 0

c  1+1 --> 2
c    (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0 ∧  p_1053) -> (-b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0)
c  in CNF:
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_2
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨  b^{3, 352}_1
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ -p_1053 ∨ -b^{3, 352}_0
c  in DIMACS:
 7442  7443 -7444 -1053 -7445 0
 7442  7443 -7444 -1053  7446 0
 7442  7443 -7444 -1053 -7447 0

c  2+1 --> break 
c    (-b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 7442 -7443  7444 -1053 1162 0


c  2-1 --> 1
c    (-b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧ -p_1053) -> (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0)
c  in CNF:
c     b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_2
c     b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_1
c     b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨  b^{3, 352}_0
c  in DIMACS:
 7442 -7443  7444  1053 -7445 0
 7442 -7443  7444  1053 -7446 0
 7442 -7443  7444  1053  7447 0

c  1-1 --> 0
c    (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0 ∧ -p_1053) -> (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧ -b^{3, 352}_0)
c  in CNF:
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_2
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_1
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_0
c  in DIMACS:
 7442  7443 -7444  1053 -7445 0
 7442  7443 -7444  1053 -7446 0
 7442  7443 -7444  1053 -7447 0

c  0-1 --> -1
c    (-b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧ -p_1053) -> ( b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0)
c  in CNF:
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨  b^{3, 352}_2
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_1
c     b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨  b^{3, 352}_0
c  in DIMACS:
 7442  7443  7444  1053  7445 0
 7442  7443  7444  1053 -7446 0
 7442  7443  7444  1053  7447 0

c  -1-1 --> -2
c    ( b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧  b^{3, 351}_0 ∧ -p_1053) -> ( b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0)
c  in CNF:
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨  b^{3, 352}_2
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨  b^{3, 352}_1
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨  p_1053 ∨ -b^{3, 352}_0
c  in DIMACS:
-7442  7443 -7444  1053  7445 0
-7442  7443 -7444  1053  7446 0
-7442  7443 -7444  1053 -7447 0

c  -2-1 --> break 
c    ( b^{3, 351}_2 ∧  b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨  b^{3, 351}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-7442 -7443  7444  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 351}_2 ∧ -b^{3, 351}_1 ∧ -b^{3, 351}_0 ∧ true) 
c  in CNF:
c    -b^{3, 351}_2 ∨  b^{3, 351}_1 ∨  b^{3, 351}_0 ∨ false 
c  in DIMACS:
-7442  7443  7444  0

c  3 does not represent an automaton state.
c    -(-b^{3, 351}_2 ∧  b^{3, 351}_1 ∧  b^{3, 351}_0 ∧ true) 
c  in CNF:
c     b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ false 
c  in DIMACS:
 7442 -7443 -7444  0
c  -3 does not represent an automaton state.
c    -( b^{3, 351}_2 ∧  b^{3, 351}_1 ∧  b^{3, 351}_0 ∧ true) 
c  in CNF:
c    -b^{3, 351}_2 ∨ -b^{3, 351}_1 ∨ -b^{3, 351}_0 ∨ false 
c  in DIMACS:
-7442 -7443 -7444  0

c i = 352
c  -2+1 --> -1
c    ( b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧  p_1056) -> ( b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0)
c  in CNF:
c    -b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨  b^{3, 353}_2
c    -b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_1
c    -b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨  b^{3, 353}_0
c  in DIMACS:
-7445 -7446  7447 -1056  7448 0
-7445 -7446  7447 -1056 -7449 0
-7445 -7446  7447 -1056  7450 0

c  -1+1 --> 0
c    ( b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0 ∧  p_1056) -> (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧ -b^{3, 353}_0)
c  in CNF:
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_2
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_1
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_0
c  in DIMACS:
-7445  7446 -7447 -1056 -7448 0
-7445  7446 -7447 -1056 -7449 0
-7445  7446 -7447 -1056 -7450 0

c  0+1 --> 1
c    (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧  p_1056) -> (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0)
c  in CNF:
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_2
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_1
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨  b^{3, 353}_0
c  in DIMACS:
 7445  7446  7447 -1056 -7448 0
 7445  7446  7447 -1056 -7449 0
 7445  7446  7447 -1056  7450 0

c  1+1 --> 2
c    (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0 ∧  p_1056) -> (-b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0)
c  in CNF:
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_2
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨  b^{3, 353}_1
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ -p_1056 ∨ -b^{3, 353}_0
c  in DIMACS:
 7445  7446 -7447 -1056 -7448 0
 7445  7446 -7447 -1056  7449 0
 7445  7446 -7447 -1056 -7450 0

c  2+1 --> break 
c    (-b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 7445 -7446  7447 -1056 1162 0


c  2-1 --> 1
c    (-b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧ -p_1056) -> (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0)
c  in CNF:
c     b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_2
c     b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_1
c     b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨  b^{3, 353}_0
c  in DIMACS:
 7445 -7446  7447  1056 -7448 0
 7445 -7446  7447  1056 -7449 0
 7445 -7446  7447  1056  7450 0

c  1-1 --> 0
c    (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0 ∧ -p_1056) -> (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧ -b^{3, 353}_0)
c  in CNF:
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_2
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_1
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_0
c  in DIMACS:
 7445  7446 -7447  1056 -7448 0
 7445  7446 -7447  1056 -7449 0
 7445  7446 -7447  1056 -7450 0

c  0-1 --> -1
c    (-b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧ -p_1056) -> ( b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0)
c  in CNF:
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨  b^{3, 353}_2
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_1
c     b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨  b^{3, 353}_0
c  in DIMACS:
 7445  7446  7447  1056  7448 0
 7445  7446  7447  1056 -7449 0
 7445  7446  7447  1056  7450 0

c  -1-1 --> -2
c    ( b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧  b^{3, 352}_0 ∧ -p_1056) -> ( b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0)
c  in CNF:
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨  b^{3, 353}_2
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨  b^{3, 353}_1
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨  p_1056 ∨ -b^{3, 353}_0
c  in DIMACS:
-7445  7446 -7447  1056  7448 0
-7445  7446 -7447  1056  7449 0
-7445  7446 -7447  1056 -7450 0

c  -2-1 --> break 
c    ( b^{3, 352}_2 ∧  b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨  b^{3, 352}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-7445 -7446  7447  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 352}_2 ∧ -b^{3, 352}_1 ∧ -b^{3, 352}_0 ∧ true) 
c  in CNF:
c    -b^{3, 352}_2 ∨  b^{3, 352}_1 ∨  b^{3, 352}_0 ∨ false 
c  in DIMACS:
-7445  7446  7447  0

c  3 does not represent an automaton state.
c    -(-b^{3, 352}_2 ∧  b^{3, 352}_1 ∧  b^{3, 352}_0 ∧ true) 
c  in CNF:
c     b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ false 
c  in DIMACS:
 7445 -7446 -7447  0
c  -3 does not represent an automaton state.
c    -( b^{3, 352}_2 ∧  b^{3, 352}_1 ∧  b^{3, 352}_0 ∧ true) 
c  in CNF:
c    -b^{3, 352}_2 ∨ -b^{3, 352}_1 ∨ -b^{3, 352}_0 ∨ false 
c  in DIMACS:
-7445 -7446 -7447  0

c i = 353
c  -2+1 --> -1
c    ( b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧  p_1059) -> ( b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0)
c  in CNF:
c    -b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨  b^{3, 354}_2
c    -b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_1
c    -b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨  b^{3, 354}_0
c  in DIMACS:
-7448 -7449  7450 -1059  7451 0
-7448 -7449  7450 -1059 -7452 0
-7448 -7449  7450 -1059  7453 0

c  -1+1 --> 0
c    ( b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0 ∧  p_1059) -> (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧ -b^{3, 354}_0)
c  in CNF:
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_2
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_1
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_0
c  in DIMACS:
-7448  7449 -7450 -1059 -7451 0
-7448  7449 -7450 -1059 -7452 0
-7448  7449 -7450 -1059 -7453 0

c  0+1 --> 1
c    (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧  p_1059) -> (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0)
c  in CNF:
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_2
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_1
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨  b^{3, 354}_0
c  in DIMACS:
 7448  7449  7450 -1059 -7451 0
 7448  7449  7450 -1059 -7452 0
 7448  7449  7450 -1059  7453 0

c  1+1 --> 2
c    (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0 ∧  p_1059) -> (-b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0)
c  in CNF:
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_2
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨  b^{3, 354}_1
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ -p_1059 ∨ -b^{3, 354}_0
c  in DIMACS:
 7448  7449 -7450 -1059 -7451 0
 7448  7449 -7450 -1059  7452 0
 7448  7449 -7450 -1059 -7453 0

c  2+1 --> break 
c    (-b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧  p_1059) -> break
c  in CNF:
c     b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ -p_1059 ∨ break
c  in DIMACS:
 7448 -7449  7450 -1059 1162 0


c  2-1 --> 1
c    (-b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧ -p_1059) -> (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0)
c  in CNF:
c     b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_2
c     b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_1
c     b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨  b^{3, 354}_0
c  in DIMACS:
 7448 -7449  7450  1059 -7451 0
 7448 -7449  7450  1059 -7452 0
 7448 -7449  7450  1059  7453 0

c  1-1 --> 0
c    (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0 ∧ -p_1059) -> (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧ -b^{3, 354}_0)
c  in CNF:
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_2
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_1
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_0
c  in DIMACS:
 7448  7449 -7450  1059 -7451 0
 7448  7449 -7450  1059 -7452 0
 7448  7449 -7450  1059 -7453 0

c  0-1 --> -1
c    (-b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧ -p_1059) -> ( b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0)
c  in CNF:
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨  b^{3, 354}_2
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_1
c     b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨  b^{3, 354}_0
c  in DIMACS:
 7448  7449  7450  1059  7451 0
 7448  7449  7450  1059 -7452 0
 7448  7449  7450  1059  7453 0

c  -1-1 --> -2
c    ( b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧  b^{3, 353}_0 ∧ -p_1059) -> ( b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0)
c  in CNF:
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨  b^{3, 354}_2
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨  b^{3, 354}_1
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨  p_1059 ∨ -b^{3, 354}_0
c  in DIMACS:
-7448  7449 -7450  1059  7451 0
-7448  7449 -7450  1059  7452 0
-7448  7449 -7450  1059 -7453 0

c  -2-1 --> break 
c    ( b^{3, 353}_2 ∧  b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧ -p_1059) -> break
c  in CNF:
c    -b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨  b^{3, 353}_0 ∨  p_1059 ∨ break
c  in DIMACS:
-7448 -7449  7450  1059 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 353}_2 ∧ -b^{3, 353}_1 ∧ -b^{3, 353}_0 ∧ true) 
c  in CNF:
c    -b^{3, 353}_2 ∨  b^{3, 353}_1 ∨  b^{3, 353}_0 ∨ false 
c  in DIMACS:
-7448  7449  7450  0

c  3 does not represent an automaton state.
c    -(-b^{3, 353}_2 ∧  b^{3, 353}_1 ∧  b^{3, 353}_0 ∧ true) 
c  in CNF:
c     b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ false 
c  in DIMACS:
 7448 -7449 -7450  0
c  -3 does not represent an automaton state.
c    -( b^{3, 353}_2 ∧  b^{3, 353}_1 ∧  b^{3, 353}_0 ∧ true) 
c  in CNF:
c    -b^{3, 353}_2 ∨ -b^{3, 353}_1 ∨ -b^{3, 353}_0 ∨ false 
c  in DIMACS:
-7448 -7449 -7450  0

c i = 354
c  -2+1 --> -1
c    ( b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧  p_1062) -> ( b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0)
c  in CNF:
c    -b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨  b^{3, 355}_2
c    -b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_1
c    -b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨  b^{3, 355}_0
c  in DIMACS:
-7451 -7452  7453 -1062  7454 0
-7451 -7452  7453 -1062 -7455 0
-7451 -7452  7453 -1062  7456 0

c  -1+1 --> 0
c    ( b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0 ∧  p_1062) -> (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧ -b^{3, 355}_0)
c  in CNF:
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_2
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_1
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_0
c  in DIMACS:
-7451  7452 -7453 -1062 -7454 0
-7451  7452 -7453 -1062 -7455 0
-7451  7452 -7453 -1062 -7456 0

c  0+1 --> 1
c    (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧  p_1062) -> (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0)
c  in CNF:
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_2
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_1
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨  b^{3, 355}_0
c  in DIMACS:
 7451  7452  7453 -1062 -7454 0
 7451  7452  7453 -1062 -7455 0
 7451  7452  7453 -1062  7456 0

c  1+1 --> 2
c    (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0 ∧  p_1062) -> (-b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0)
c  in CNF:
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_2
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨  b^{3, 355}_1
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ -p_1062 ∨ -b^{3, 355}_0
c  in DIMACS:
 7451  7452 -7453 -1062 -7454 0
 7451  7452 -7453 -1062  7455 0
 7451  7452 -7453 -1062 -7456 0

c  2+1 --> break 
c    (-b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 7451 -7452  7453 -1062 1162 0


c  2-1 --> 1
c    (-b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧ -p_1062) -> (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0)
c  in CNF:
c     b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_2
c     b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_1
c     b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨  b^{3, 355}_0
c  in DIMACS:
 7451 -7452  7453  1062 -7454 0
 7451 -7452  7453  1062 -7455 0
 7451 -7452  7453  1062  7456 0

c  1-1 --> 0
c    (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0 ∧ -p_1062) -> (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧ -b^{3, 355}_0)
c  in CNF:
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_2
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_1
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_0
c  in DIMACS:
 7451  7452 -7453  1062 -7454 0
 7451  7452 -7453  1062 -7455 0
 7451  7452 -7453  1062 -7456 0

c  0-1 --> -1
c    (-b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧ -p_1062) -> ( b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0)
c  in CNF:
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨  b^{3, 355}_2
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_1
c     b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨  b^{3, 355}_0
c  in DIMACS:
 7451  7452  7453  1062  7454 0
 7451  7452  7453  1062 -7455 0
 7451  7452  7453  1062  7456 0

c  -1-1 --> -2
c    ( b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧  b^{3, 354}_0 ∧ -p_1062) -> ( b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0)
c  in CNF:
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨  b^{3, 355}_2
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨  b^{3, 355}_1
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨  p_1062 ∨ -b^{3, 355}_0
c  in DIMACS:
-7451  7452 -7453  1062  7454 0
-7451  7452 -7453  1062  7455 0
-7451  7452 -7453  1062 -7456 0

c  -2-1 --> break 
c    ( b^{3, 354}_2 ∧  b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨  b^{3, 354}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-7451 -7452  7453  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 354}_2 ∧ -b^{3, 354}_1 ∧ -b^{3, 354}_0 ∧ true) 
c  in CNF:
c    -b^{3, 354}_2 ∨  b^{3, 354}_1 ∨  b^{3, 354}_0 ∨ false 
c  in DIMACS:
-7451  7452  7453  0

c  3 does not represent an automaton state.
c    -(-b^{3, 354}_2 ∧  b^{3, 354}_1 ∧  b^{3, 354}_0 ∧ true) 
c  in CNF:
c     b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ false 
c  in DIMACS:
 7451 -7452 -7453  0
c  -3 does not represent an automaton state.
c    -( b^{3, 354}_2 ∧  b^{3, 354}_1 ∧  b^{3, 354}_0 ∧ true) 
c  in CNF:
c    -b^{3, 354}_2 ∨ -b^{3, 354}_1 ∨ -b^{3, 354}_0 ∨ false 
c  in DIMACS:
-7451 -7452 -7453  0

c i = 355
c  -2+1 --> -1
c    ( b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧  p_1065) -> ( b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0)
c  in CNF:
c    -b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨  b^{3, 356}_2
c    -b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_1
c    -b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨  b^{3, 356}_0
c  in DIMACS:
-7454 -7455  7456 -1065  7457 0
-7454 -7455  7456 -1065 -7458 0
-7454 -7455  7456 -1065  7459 0

c  -1+1 --> 0
c    ( b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0 ∧  p_1065) -> (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧ -b^{3, 356}_0)
c  in CNF:
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_2
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_1
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_0
c  in DIMACS:
-7454  7455 -7456 -1065 -7457 0
-7454  7455 -7456 -1065 -7458 0
-7454  7455 -7456 -1065 -7459 0

c  0+1 --> 1
c    (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧  p_1065) -> (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0)
c  in CNF:
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_2
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_1
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨  b^{3, 356}_0
c  in DIMACS:
 7454  7455  7456 -1065 -7457 0
 7454  7455  7456 -1065 -7458 0
 7454  7455  7456 -1065  7459 0

c  1+1 --> 2
c    (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0 ∧  p_1065) -> (-b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0)
c  in CNF:
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_2
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨  b^{3, 356}_1
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ -p_1065 ∨ -b^{3, 356}_0
c  in DIMACS:
 7454  7455 -7456 -1065 -7457 0
 7454  7455 -7456 -1065  7458 0
 7454  7455 -7456 -1065 -7459 0

c  2+1 --> break 
c    (-b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 7454 -7455  7456 -1065 1162 0


c  2-1 --> 1
c    (-b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧ -p_1065) -> (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0)
c  in CNF:
c     b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_2
c     b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_1
c     b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨  b^{3, 356}_0
c  in DIMACS:
 7454 -7455  7456  1065 -7457 0
 7454 -7455  7456  1065 -7458 0
 7454 -7455  7456  1065  7459 0

c  1-1 --> 0
c    (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0 ∧ -p_1065) -> (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧ -b^{3, 356}_0)
c  in CNF:
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_2
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_1
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_0
c  in DIMACS:
 7454  7455 -7456  1065 -7457 0
 7454  7455 -7456  1065 -7458 0
 7454  7455 -7456  1065 -7459 0

c  0-1 --> -1
c    (-b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧ -p_1065) -> ( b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0)
c  in CNF:
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨  b^{3, 356}_2
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_1
c     b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨  b^{3, 356}_0
c  in DIMACS:
 7454  7455  7456  1065  7457 0
 7454  7455  7456  1065 -7458 0
 7454  7455  7456  1065  7459 0

c  -1-1 --> -2
c    ( b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧  b^{3, 355}_0 ∧ -p_1065) -> ( b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0)
c  in CNF:
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨  b^{3, 356}_2
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨  b^{3, 356}_1
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨  p_1065 ∨ -b^{3, 356}_0
c  in DIMACS:
-7454  7455 -7456  1065  7457 0
-7454  7455 -7456  1065  7458 0
-7454  7455 -7456  1065 -7459 0

c  -2-1 --> break 
c    ( b^{3, 355}_2 ∧  b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨  b^{3, 355}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-7454 -7455  7456  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 355}_2 ∧ -b^{3, 355}_1 ∧ -b^{3, 355}_0 ∧ true) 
c  in CNF:
c    -b^{3, 355}_2 ∨  b^{3, 355}_1 ∨  b^{3, 355}_0 ∨ false 
c  in DIMACS:
-7454  7455  7456  0

c  3 does not represent an automaton state.
c    -(-b^{3, 355}_2 ∧  b^{3, 355}_1 ∧  b^{3, 355}_0 ∧ true) 
c  in CNF:
c     b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ false 
c  in DIMACS:
 7454 -7455 -7456  0
c  -3 does not represent an automaton state.
c    -( b^{3, 355}_2 ∧  b^{3, 355}_1 ∧  b^{3, 355}_0 ∧ true) 
c  in CNF:
c    -b^{3, 355}_2 ∨ -b^{3, 355}_1 ∨ -b^{3, 355}_0 ∨ false 
c  in DIMACS:
-7454 -7455 -7456  0

c i = 356
c  -2+1 --> -1
c    ( b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧  p_1068) -> ( b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0)
c  in CNF:
c    -b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨  b^{3, 357}_2
c    -b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_1
c    -b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨  b^{3, 357}_0
c  in DIMACS:
-7457 -7458  7459 -1068  7460 0
-7457 -7458  7459 -1068 -7461 0
-7457 -7458  7459 -1068  7462 0

c  -1+1 --> 0
c    ( b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0 ∧  p_1068) -> (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧ -b^{3, 357}_0)
c  in CNF:
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_2
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_1
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_0
c  in DIMACS:
-7457  7458 -7459 -1068 -7460 0
-7457  7458 -7459 -1068 -7461 0
-7457  7458 -7459 -1068 -7462 0

c  0+1 --> 1
c    (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧  p_1068) -> (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0)
c  in CNF:
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_2
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_1
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨  b^{3, 357}_0
c  in DIMACS:
 7457  7458  7459 -1068 -7460 0
 7457  7458  7459 -1068 -7461 0
 7457  7458  7459 -1068  7462 0

c  1+1 --> 2
c    (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0 ∧  p_1068) -> (-b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0)
c  in CNF:
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_2
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨  b^{3, 357}_1
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ -p_1068 ∨ -b^{3, 357}_0
c  in DIMACS:
 7457  7458 -7459 -1068 -7460 0
 7457  7458 -7459 -1068  7461 0
 7457  7458 -7459 -1068 -7462 0

c  2+1 --> break 
c    (-b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 7457 -7458  7459 -1068 1162 0


c  2-1 --> 1
c    (-b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧ -p_1068) -> (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0)
c  in CNF:
c     b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_2
c     b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_1
c     b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨  b^{3, 357}_0
c  in DIMACS:
 7457 -7458  7459  1068 -7460 0
 7457 -7458  7459  1068 -7461 0
 7457 -7458  7459  1068  7462 0

c  1-1 --> 0
c    (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0 ∧ -p_1068) -> (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧ -b^{3, 357}_0)
c  in CNF:
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_2
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_1
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_0
c  in DIMACS:
 7457  7458 -7459  1068 -7460 0
 7457  7458 -7459  1068 -7461 0
 7457  7458 -7459  1068 -7462 0

c  0-1 --> -1
c    (-b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧ -p_1068) -> ( b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0)
c  in CNF:
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨  b^{3, 357}_2
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_1
c     b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨  b^{3, 357}_0
c  in DIMACS:
 7457  7458  7459  1068  7460 0
 7457  7458  7459  1068 -7461 0
 7457  7458  7459  1068  7462 0

c  -1-1 --> -2
c    ( b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧  b^{3, 356}_0 ∧ -p_1068) -> ( b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0)
c  in CNF:
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨  b^{3, 357}_2
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨  b^{3, 357}_1
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨  p_1068 ∨ -b^{3, 357}_0
c  in DIMACS:
-7457  7458 -7459  1068  7460 0
-7457  7458 -7459  1068  7461 0
-7457  7458 -7459  1068 -7462 0

c  -2-1 --> break 
c    ( b^{3, 356}_2 ∧  b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨  b^{3, 356}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-7457 -7458  7459  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 356}_2 ∧ -b^{3, 356}_1 ∧ -b^{3, 356}_0 ∧ true) 
c  in CNF:
c    -b^{3, 356}_2 ∨  b^{3, 356}_1 ∨  b^{3, 356}_0 ∨ false 
c  in DIMACS:
-7457  7458  7459  0

c  3 does not represent an automaton state.
c    -(-b^{3, 356}_2 ∧  b^{3, 356}_1 ∧  b^{3, 356}_0 ∧ true) 
c  in CNF:
c     b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ false 
c  in DIMACS:
 7457 -7458 -7459  0
c  -3 does not represent an automaton state.
c    -( b^{3, 356}_2 ∧  b^{3, 356}_1 ∧  b^{3, 356}_0 ∧ true) 
c  in CNF:
c    -b^{3, 356}_2 ∨ -b^{3, 356}_1 ∨ -b^{3, 356}_0 ∨ false 
c  in DIMACS:
-7457 -7458 -7459  0

c i = 357
c  -2+1 --> -1
c    ( b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧  p_1071) -> ( b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0)
c  in CNF:
c    -b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨  b^{3, 358}_2
c    -b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_1
c    -b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨  b^{3, 358}_0
c  in DIMACS:
-7460 -7461  7462 -1071  7463 0
-7460 -7461  7462 -1071 -7464 0
-7460 -7461  7462 -1071  7465 0

c  -1+1 --> 0
c    ( b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0 ∧  p_1071) -> (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧ -b^{3, 358}_0)
c  in CNF:
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_2
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_1
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_0
c  in DIMACS:
-7460  7461 -7462 -1071 -7463 0
-7460  7461 -7462 -1071 -7464 0
-7460  7461 -7462 -1071 -7465 0

c  0+1 --> 1
c    (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧  p_1071) -> (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0)
c  in CNF:
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_2
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_1
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨  b^{3, 358}_0
c  in DIMACS:
 7460  7461  7462 -1071 -7463 0
 7460  7461  7462 -1071 -7464 0
 7460  7461  7462 -1071  7465 0

c  1+1 --> 2
c    (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0 ∧  p_1071) -> (-b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0)
c  in CNF:
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_2
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨  b^{3, 358}_1
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ -p_1071 ∨ -b^{3, 358}_0
c  in DIMACS:
 7460  7461 -7462 -1071 -7463 0
 7460  7461 -7462 -1071  7464 0
 7460  7461 -7462 -1071 -7465 0

c  2+1 --> break 
c    (-b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 7460 -7461  7462 -1071 1162 0


c  2-1 --> 1
c    (-b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧ -p_1071) -> (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0)
c  in CNF:
c     b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_2
c     b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_1
c     b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨  b^{3, 358}_0
c  in DIMACS:
 7460 -7461  7462  1071 -7463 0
 7460 -7461  7462  1071 -7464 0
 7460 -7461  7462  1071  7465 0

c  1-1 --> 0
c    (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0 ∧ -p_1071) -> (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧ -b^{3, 358}_0)
c  in CNF:
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_2
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_1
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_0
c  in DIMACS:
 7460  7461 -7462  1071 -7463 0
 7460  7461 -7462  1071 -7464 0
 7460  7461 -7462  1071 -7465 0

c  0-1 --> -1
c    (-b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧ -p_1071) -> ( b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0)
c  in CNF:
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨  b^{3, 358}_2
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_1
c     b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨  b^{3, 358}_0
c  in DIMACS:
 7460  7461  7462  1071  7463 0
 7460  7461  7462  1071 -7464 0
 7460  7461  7462  1071  7465 0

c  -1-1 --> -2
c    ( b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧  b^{3, 357}_0 ∧ -p_1071) -> ( b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0)
c  in CNF:
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨  b^{3, 358}_2
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨  b^{3, 358}_1
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨  p_1071 ∨ -b^{3, 358}_0
c  in DIMACS:
-7460  7461 -7462  1071  7463 0
-7460  7461 -7462  1071  7464 0
-7460  7461 -7462  1071 -7465 0

c  -2-1 --> break 
c    ( b^{3, 357}_2 ∧  b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨  b^{3, 357}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-7460 -7461  7462  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 357}_2 ∧ -b^{3, 357}_1 ∧ -b^{3, 357}_0 ∧ true) 
c  in CNF:
c    -b^{3, 357}_2 ∨  b^{3, 357}_1 ∨  b^{3, 357}_0 ∨ false 
c  in DIMACS:
-7460  7461  7462  0

c  3 does not represent an automaton state.
c    -(-b^{3, 357}_2 ∧  b^{3, 357}_1 ∧  b^{3, 357}_0 ∧ true) 
c  in CNF:
c     b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ false 
c  in DIMACS:
 7460 -7461 -7462  0
c  -3 does not represent an automaton state.
c    -( b^{3, 357}_2 ∧  b^{3, 357}_1 ∧  b^{3, 357}_0 ∧ true) 
c  in CNF:
c    -b^{3, 357}_2 ∨ -b^{3, 357}_1 ∨ -b^{3, 357}_0 ∨ false 
c  in DIMACS:
-7460 -7461 -7462  0

c i = 358
c  -2+1 --> -1
c    ( b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧  p_1074) -> ( b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0)
c  in CNF:
c    -b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨  b^{3, 359}_2
c    -b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_1
c    -b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨  b^{3, 359}_0
c  in DIMACS:
-7463 -7464  7465 -1074  7466 0
-7463 -7464  7465 -1074 -7467 0
-7463 -7464  7465 -1074  7468 0

c  -1+1 --> 0
c    ( b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0 ∧  p_1074) -> (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧ -b^{3, 359}_0)
c  in CNF:
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_2
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_1
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_0
c  in DIMACS:
-7463  7464 -7465 -1074 -7466 0
-7463  7464 -7465 -1074 -7467 0
-7463  7464 -7465 -1074 -7468 0

c  0+1 --> 1
c    (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧  p_1074) -> (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0)
c  in CNF:
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_2
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_1
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨  b^{3, 359}_0
c  in DIMACS:
 7463  7464  7465 -1074 -7466 0
 7463  7464  7465 -1074 -7467 0
 7463  7464  7465 -1074  7468 0

c  1+1 --> 2
c    (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0 ∧  p_1074) -> (-b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0)
c  in CNF:
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_2
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨  b^{3, 359}_1
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ -p_1074 ∨ -b^{3, 359}_0
c  in DIMACS:
 7463  7464 -7465 -1074 -7466 0
 7463  7464 -7465 -1074  7467 0
 7463  7464 -7465 -1074 -7468 0

c  2+1 --> break 
c    (-b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 7463 -7464  7465 -1074 1162 0


c  2-1 --> 1
c    (-b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧ -p_1074) -> (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0)
c  in CNF:
c     b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_2
c     b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_1
c     b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨  b^{3, 359}_0
c  in DIMACS:
 7463 -7464  7465  1074 -7466 0
 7463 -7464  7465  1074 -7467 0
 7463 -7464  7465  1074  7468 0

c  1-1 --> 0
c    (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0 ∧ -p_1074) -> (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧ -b^{3, 359}_0)
c  in CNF:
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_2
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_1
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_0
c  in DIMACS:
 7463  7464 -7465  1074 -7466 0
 7463  7464 -7465  1074 -7467 0
 7463  7464 -7465  1074 -7468 0

c  0-1 --> -1
c    (-b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧ -p_1074) -> ( b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0)
c  in CNF:
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨  b^{3, 359}_2
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_1
c     b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨  b^{3, 359}_0
c  in DIMACS:
 7463  7464  7465  1074  7466 0
 7463  7464  7465  1074 -7467 0
 7463  7464  7465  1074  7468 0

c  -1-1 --> -2
c    ( b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧  b^{3, 358}_0 ∧ -p_1074) -> ( b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0)
c  in CNF:
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨  b^{3, 359}_2
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨  b^{3, 359}_1
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨  p_1074 ∨ -b^{3, 359}_0
c  in DIMACS:
-7463  7464 -7465  1074  7466 0
-7463  7464 -7465  1074  7467 0
-7463  7464 -7465  1074 -7468 0

c  -2-1 --> break 
c    ( b^{3, 358}_2 ∧  b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨  b^{3, 358}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-7463 -7464  7465  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 358}_2 ∧ -b^{3, 358}_1 ∧ -b^{3, 358}_0 ∧ true) 
c  in CNF:
c    -b^{3, 358}_2 ∨  b^{3, 358}_1 ∨  b^{3, 358}_0 ∨ false 
c  in DIMACS:
-7463  7464  7465  0

c  3 does not represent an automaton state.
c    -(-b^{3, 358}_2 ∧  b^{3, 358}_1 ∧  b^{3, 358}_0 ∧ true) 
c  in CNF:
c     b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ false 
c  in DIMACS:
 7463 -7464 -7465  0
c  -3 does not represent an automaton state.
c    -( b^{3, 358}_2 ∧  b^{3, 358}_1 ∧  b^{3, 358}_0 ∧ true) 
c  in CNF:
c    -b^{3, 358}_2 ∨ -b^{3, 358}_1 ∨ -b^{3, 358}_0 ∨ false 
c  in DIMACS:
-7463 -7464 -7465  0

c i = 359
c  -2+1 --> -1
c    ( b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧  p_1077) -> ( b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0)
c  in CNF:
c    -b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨  b^{3, 360}_2
c    -b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_1
c    -b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨  b^{3, 360}_0
c  in DIMACS:
-7466 -7467  7468 -1077  7469 0
-7466 -7467  7468 -1077 -7470 0
-7466 -7467  7468 -1077  7471 0

c  -1+1 --> 0
c    ( b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0 ∧  p_1077) -> (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧ -b^{3, 360}_0)
c  in CNF:
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_2
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_1
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_0
c  in DIMACS:
-7466  7467 -7468 -1077 -7469 0
-7466  7467 -7468 -1077 -7470 0
-7466  7467 -7468 -1077 -7471 0

c  0+1 --> 1
c    (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧  p_1077) -> (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0)
c  in CNF:
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_2
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_1
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨  b^{3, 360}_0
c  in DIMACS:
 7466  7467  7468 -1077 -7469 0
 7466  7467  7468 -1077 -7470 0
 7466  7467  7468 -1077  7471 0

c  1+1 --> 2
c    (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0 ∧  p_1077) -> (-b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0)
c  in CNF:
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_2
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨  b^{3, 360}_1
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ -p_1077 ∨ -b^{3, 360}_0
c  in DIMACS:
 7466  7467 -7468 -1077 -7469 0
 7466  7467 -7468 -1077  7470 0
 7466  7467 -7468 -1077 -7471 0

c  2+1 --> break 
c    (-b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧  p_1077) -> break
c  in CNF:
c     b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ -p_1077 ∨ break
c  in DIMACS:
 7466 -7467  7468 -1077 1162 0


c  2-1 --> 1
c    (-b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧ -p_1077) -> (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0)
c  in CNF:
c     b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_2
c     b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_1
c     b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨  b^{3, 360}_0
c  in DIMACS:
 7466 -7467  7468  1077 -7469 0
 7466 -7467  7468  1077 -7470 0
 7466 -7467  7468  1077  7471 0

c  1-1 --> 0
c    (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0 ∧ -p_1077) -> (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧ -b^{3, 360}_0)
c  in CNF:
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_2
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_1
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_0
c  in DIMACS:
 7466  7467 -7468  1077 -7469 0
 7466  7467 -7468  1077 -7470 0
 7466  7467 -7468  1077 -7471 0

c  0-1 --> -1
c    (-b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧ -p_1077) -> ( b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0)
c  in CNF:
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨  b^{3, 360}_2
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_1
c     b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨  b^{3, 360}_0
c  in DIMACS:
 7466  7467  7468  1077  7469 0
 7466  7467  7468  1077 -7470 0
 7466  7467  7468  1077  7471 0

c  -1-1 --> -2
c    ( b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧  b^{3, 359}_0 ∧ -p_1077) -> ( b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0)
c  in CNF:
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨  b^{3, 360}_2
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨  b^{3, 360}_1
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨  p_1077 ∨ -b^{3, 360}_0
c  in DIMACS:
-7466  7467 -7468  1077  7469 0
-7466  7467 -7468  1077  7470 0
-7466  7467 -7468  1077 -7471 0

c  -2-1 --> break 
c    ( b^{3, 359}_2 ∧  b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧ -p_1077) -> break
c  in CNF:
c    -b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨  b^{3, 359}_0 ∨  p_1077 ∨ break
c  in DIMACS:
-7466 -7467  7468  1077 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 359}_2 ∧ -b^{3, 359}_1 ∧ -b^{3, 359}_0 ∧ true) 
c  in CNF:
c    -b^{3, 359}_2 ∨  b^{3, 359}_1 ∨  b^{3, 359}_0 ∨ false 
c  in DIMACS:
-7466  7467  7468  0

c  3 does not represent an automaton state.
c    -(-b^{3, 359}_2 ∧  b^{3, 359}_1 ∧  b^{3, 359}_0 ∧ true) 
c  in CNF:
c     b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ false 
c  in DIMACS:
 7466 -7467 -7468  0
c  -3 does not represent an automaton state.
c    -( b^{3, 359}_2 ∧  b^{3, 359}_1 ∧  b^{3, 359}_0 ∧ true) 
c  in CNF:
c    -b^{3, 359}_2 ∨ -b^{3, 359}_1 ∨ -b^{3, 359}_0 ∨ false 
c  in DIMACS:
-7466 -7467 -7468  0

c i = 360
c  -2+1 --> -1
c    ( b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧  p_1080) -> ( b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0)
c  in CNF:
c    -b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨  b^{3, 361}_2
c    -b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_1
c    -b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨  b^{3, 361}_0
c  in DIMACS:
-7469 -7470  7471 -1080  7472 0
-7469 -7470  7471 -1080 -7473 0
-7469 -7470  7471 -1080  7474 0

c  -1+1 --> 0
c    ( b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0 ∧  p_1080) -> (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧ -b^{3, 361}_0)
c  in CNF:
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_2
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_1
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_0
c  in DIMACS:
-7469  7470 -7471 -1080 -7472 0
-7469  7470 -7471 -1080 -7473 0
-7469  7470 -7471 -1080 -7474 0

c  0+1 --> 1
c    (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧  p_1080) -> (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0)
c  in CNF:
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_2
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_1
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨  b^{3, 361}_0
c  in DIMACS:
 7469  7470  7471 -1080 -7472 0
 7469  7470  7471 -1080 -7473 0
 7469  7470  7471 -1080  7474 0

c  1+1 --> 2
c    (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0 ∧  p_1080) -> (-b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0)
c  in CNF:
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_2
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨  b^{3, 361}_1
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ -p_1080 ∨ -b^{3, 361}_0
c  in DIMACS:
 7469  7470 -7471 -1080 -7472 0
 7469  7470 -7471 -1080  7473 0
 7469  7470 -7471 -1080 -7474 0

c  2+1 --> break 
c    (-b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 7469 -7470  7471 -1080 1162 0


c  2-1 --> 1
c    (-b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧ -p_1080) -> (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0)
c  in CNF:
c     b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_2
c     b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_1
c     b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨  b^{3, 361}_0
c  in DIMACS:
 7469 -7470  7471  1080 -7472 0
 7469 -7470  7471  1080 -7473 0
 7469 -7470  7471  1080  7474 0

c  1-1 --> 0
c    (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0 ∧ -p_1080) -> (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧ -b^{3, 361}_0)
c  in CNF:
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_2
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_1
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_0
c  in DIMACS:
 7469  7470 -7471  1080 -7472 0
 7469  7470 -7471  1080 -7473 0
 7469  7470 -7471  1080 -7474 0

c  0-1 --> -1
c    (-b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧ -p_1080) -> ( b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0)
c  in CNF:
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨  b^{3, 361}_2
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_1
c     b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨  b^{3, 361}_0
c  in DIMACS:
 7469  7470  7471  1080  7472 0
 7469  7470  7471  1080 -7473 0
 7469  7470  7471  1080  7474 0

c  -1-1 --> -2
c    ( b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧  b^{3, 360}_0 ∧ -p_1080) -> ( b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0)
c  in CNF:
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨  b^{3, 361}_2
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨  b^{3, 361}_1
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨  p_1080 ∨ -b^{3, 361}_0
c  in DIMACS:
-7469  7470 -7471  1080  7472 0
-7469  7470 -7471  1080  7473 0
-7469  7470 -7471  1080 -7474 0

c  -2-1 --> break 
c    ( b^{3, 360}_2 ∧  b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨  b^{3, 360}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-7469 -7470  7471  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 360}_2 ∧ -b^{3, 360}_1 ∧ -b^{3, 360}_0 ∧ true) 
c  in CNF:
c    -b^{3, 360}_2 ∨  b^{3, 360}_1 ∨  b^{3, 360}_0 ∨ false 
c  in DIMACS:
-7469  7470  7471  0

c  3 does not represent an automaton state.
c    -(-b^{3, 360}_2 ∧  b^{3, 360}_1 ∧  b^{3, 360}_0 ∧ true) 
c  in CNF:
c     b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ false 
c  in DIMACS:
 7469 -7470 -7471  0
c  -3 does not represent an automaton state.
c    -( b^{3, 360}_2 ∧  b^{3, 360}_1 ∧  b^{3, 360}_0 ∧ true) 
c  in CNF:
c    -b^{3, 360}_2 ∨ -b^{3, 360}_1 ∨ -b^{3, 360}_0 ∨ false 
c  in DIMACS:
-7469 -7470 -7471  0

c i = 361
c  -2+1 --> -1
c    ( b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧  p_1083) -> ( b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0)
c  in CNF:
c    -b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨  b^{3, 362}_2
c    -b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_1
c    -b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨  b^{3, 362}_0
c  in DIMACS:
-7472 -7473  7474 -1083  7475 0
-7472 -7473  7474 -1083 -7476 0
-7472 -7473  7474 -1083  7477 0

c  -1+1 --> 0
c    ( b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0 ∧  p_1083) -> (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧ -b^{3, 362}_0)
c  in CNF:
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_2
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_1
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_0
c  in DIMACS:
-7472  7473 -7474 -1083 -7475 0
-7472  7473 -7474 -1083 -7476 0
-7472  7473 -7474 -1083 -7477 0

c  0+1 --> 1
c    (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧  p_1083) -> (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0)
c  in CNF:
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_2
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_1
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨  b^{3, 362}_0
c  in DIMACS:
 7472  7473  7474 -1083 -7475 0
 7472  7473  7474 -1083 -7476 0
 7472  7473  7474 -1083  7477 0

c  1+1 --> 2
c    (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0 ∧  p_1083) -> (-b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0)
c  in CNF:
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_2
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨  b^{3, 362}_1
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ -p_1083 ∨ -b^{3, 362}_0
c  in DIMACS:
 7472  7473 -7474 -1083 -7475 0
 7472  7473 -7474 -1083  7476 0
 7472  7473 -7474 -1083 -7477 0

c  2+1 --> break 
c    (-b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧  p_1083) -> break
c  in CNF:
c     b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ -p_1083 ∨ break
c  in DIMACS:
 7472 -7473  7474 -1083 1162 0


c  2-1 --> 1
c    (-b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧ -p_1083) -> (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0)
c  in CNF:
c     b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_2
c     b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_1
c     b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨  b^{3, 362}_0
c  in DIMACS:
 7472 -7473  7474  1083 -7475 0
 7472 -7473  7474  1083 -7476 0
 7472 -7473  7474  1083  7477 0

c  1-1 --> 0
c    (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0 ∧ -p_1083) -> (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧ -b^{3, 362}_0)
c  in CNF:
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_2
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_1
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_0
c  in DIMACS:
 7472  7473 -7474  1083 -7475 0
 7472  7473 -7474  1083 -7476 0
 7472  7473 -7474  1083 -7477 0

c  0-1 --> -1
c    (-b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧ -p_1083) -> ( b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0)
c  in CNF:
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨  b^{3, 362}_2
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_1
c     b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨  b^{3, 362}_0
c  in DIMACS:
 7472  7473  7474  1083  7475 0
 7472  7473  7474  1083 -7476 0
 7472  7473  7474  1083  7477 0

c  -1-1 --> -2
c    ( b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧  b^{3, 361}_0 ∧ -p_1083) -> ( b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0)
c  in CNF:
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨  b^{3, 362}_2
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨  b^{3, 362}_1
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨  p_1083 ∨ -b^{3, 362}_0
c  in DIMACS:
-7472  7473 -7474  1083  7475 0
-7472  7473 -7474  1083  7476 0
-7472  7473 -7474  1083 -7477 0

c  -2-1 --> break 
c    ( b^{3, 361}_2 ∧  b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧ -p_1083) -> break
c  in CNF:
c    -b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨  b^{3, 361}_0 ∨  p_1083 ∨ break
c  in DIMACS:
-7472 -7473  7474  1083 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 361}_2 ∧ -b^{3, 361}_1 ∧ -b^{3, 361}_0 ∧ true) 
c  in CNF:
c    -b^{3, 361}_2 ∨  b^{3, 361}_1 ∨  b^{3, 361}_0 ∨ false 
c  in DIMACS:
-7472  7473  7474  0

c  3 does not represent an automaton state.
c    -(-b^{3, 361}_2 ∧  b^{3, 361}_1 ∧  b^{3, 361}_0 ∧ true) 
c  in CNF:
c     b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ false 
c  in DIMACS:
 7472 -7473 -7474  0
c  -3 does not represent an automaton state.
c    -( b^{3, 361}_2 ∧  b^{3, 361}_1 ∧  b^{3, 361}_0 ∧ true) 
c  in CNF:
c    -b^{3, 361}_2 ∨ -b^{3, 361}_1 ∨ -b^{3, 361}_0 ∨ false 
c  in DIMACS:
-7472 -7473 -7474  0

c i = 362
c  -2+1 --> -1
c    ( b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧  p_1086) -> ( b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0)
c  in CNF:
c    -b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨  b^{3, 363}_2
c    -b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_1
c    -b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨  b^{3, 363}_0
c  in DIMACS:
-7475 -7476  7477 -1086  7478 0
-7475 -7476  7477 -1086 -7479 0
-7475 -7476  7477 -1086  7480 0

c  -1+1 --> 0
c    ( b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0 ∧  p_1086) -> (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧ -b^{3, 363}_0)
c  in CNF:
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_2
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_1
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_0
c  in DIMACS:
-7475  7476 -7477 -1086 -7478 0
-7475  7476 -7477 -1086 -7479 0
-7475  7476 -7477 -1086 -7480 0

c  0+1 --> 1
c    (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧  p_1086) -> (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0)
c  in CNF:
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_2
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_1
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨  b^{3, 363}_0
c  in DIMACS:
 7475  7476  7477 -1086 -7478 0
 7475  7476  7477 -1086 -7479 0
 7475  7476  7477 -1086  7480 0

c  1+1 --> 2
c    (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0 ∧  p_1086) -> (-b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0)
c  in CNF:
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_2
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨  b^{3, 363}_1
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ -p_1086 ∨ -b^{3, 363}_0
c  in DIMACS:
 7475  7476 -7477 -1086 -7478 0
 7475  7476 -7477 -1086  7479 0
 7475  7476 -7477 -1086 -7480 0

c  2+1 --> break 
c    (-b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 7475 -7476  7477 -1086 1162 0


c  2-1 --> 1
c    (-b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧ -p_1086) -> (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0)
c  in CNF:
c     b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_2
c     b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_1
c     b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨  b^{3, 363}_0
c  in DIMACS:
 7475 -7476  7477  1086 -7478 0
 7475 -7476  7477  1086 -7479 0
 7475 -7476  7477  1086  7480 0

c  1-1 --> 0
c    (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0 ∧ -p_1086) -> (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧ -b^{3, 363}_0)
c  in CNF:
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_2
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_1
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_0
c  in DIMACS:
 7475  7476 -7477  1086 -7478 0
 7475  7476 -7477  1086 -7479 0
 7475  7476 -7477  1086 -7480 0

c  0-1 --> -1
c    (-b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧ -p_1086) -> ( b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0)
c  in CNF:
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨  b^{3, 363}_2
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_1
c     b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨  b^{3, 363}_0
c  in DIMACS:
 7475  7476  7477  1086  7478 0
 7475  7476  7477  1086 -7479 0
 7475  7476  7477  1086  7480 0

c  -1-1 --> -2
c    ( b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧  b^{3, 362}_0 ∧ -p_1086) -> ( b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0)
c  in CNF:
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨  b^{3, 363}_2
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨  b^{3, 363}_1
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨  p_1086 ∨ -b^{3, 363}_0
c  in DIMACS:
-7475  7476 -7477  1086  7478 0
-7475  7476 -7477  1086  7479 0
-7475  7476 -7477  1086 -7480 0

c  -2-1 --> break 
c    ( b^{3, 362}_2 ∧  b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨  b^{3, 362}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-7475 -7476  7477  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 362}_2 ∧ -b^{3, 362}_1 ∧ -b^{3, 362}_0 ∧ true) 
c  in CNF:
c    -b^{3, 362}_2 ∨  b^{3, 362}_1 ∨  b^{3, 362}_0 ∨ false 
c  in DIMACS:
-7475  7476  7477  0

c  3 does not represent an automaton state.
c    -(-b^{3, 362}_2 ∧  b^{3, 362}_1 ∧  b^{3, 362}_0 ∧ true) 
c  in CNF:
c     b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ false 
c  in DIMACS:
 7475 -7476 -7477  0
c  -3 does not represent an automaton state.
c    -( b^{3, 362}_2 ∧  b^{3, 362}_1 ∧  b^{3, 362}_0 ∧ true) 
c  in CNF:
c    -b^{3, 362}_2 ∨ -b^{3, 362}_1 ∨ -b^{3, 362}_0 ∨ false 
c  in DIMACS:
-7475 -7476 -7477  0

c i = 363
c  -2+1 --> -1
c    ( b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧  p_1089) -> ( b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0)
c  in CNF:
c    -b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨  b^{3, 364}_2
c    -b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_1
c    -b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨  b^{3, 364}_0
c  in DIMACS:
-7478 -7479  7480 -1089  7481 0
-7478 -7479  7480 -1089 -7482 0
-7478 -7479  7480 -1089  7483 0

c  -1+1 --> 0
c    ( b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0 ∧  p_1089) -> (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧ -b^{3, 364}_0)
c  in CNF:
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_2
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_1
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_0
c  in DIMACS:
-7478  7479 -7480 -1089 -7481 0
-7478  7479 -7480 -1089 -7482 0
-7478  7479 -7480 -1089 -7483 0

c  0+1 --> 1
c    (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧  p_1089) -> (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0)
c  in CNF:
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_2
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_1
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨  b^{3, 364}_0
c  in DIMACS:
 7478  7479  7480 -1089 -7481 0
 7478  7479  7480 -1089 -7482 0
 7478  7479  7480 -1089  7483 0

c  1+1 --> 2
c    (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0 ∧  p_1089) -> (-b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0)
c  in CNF:
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_2
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨  b^{3, 364}_1
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ -p_1089 ∨ -b^{3, 364}_0
c  in DIMACS:
 7478  7479 -7480 -1089 -7481 0
 7478  7479 -7480 -1089  7482 0
 7478  7479 -7480 -1089 -7483 0

c  2+1 --> break 
c    (-b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 7478 -7479  7480 -1089 1162 0


c  2-1 --> 1
c    (-b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧ -p_1089) -> (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0)
c  in CNF:
c     b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_2
c     b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_1
c     b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨  b^{3, 364}_0
c  in DIMACS:
 7478 -7479  7480  1089 -7481 0
 7478 -7479  7480  1089 -7482 0
 7478 -7479  7480  1089  7483 0

c  1-1 --> 0
c    (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0 ∧ -p_1089) -> (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧ -b^{3, 364}_0)
c  in CNF:
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_2
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_1
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_0
c  in DIMACS:
 7478  7479 -7480  1089 -7481 0
 7478  7479 -7480  1089 -7482 0
 7478  7479 -7480  1089 -7483 0

c  0-1 --> -1
c    (-b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧ -p_1089) -> ( b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0)
c  in CNF:
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨  b^{3, 364}_2
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_1
c     b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨  b^{3, 364}_0
c  in DIMACS:
 7478  7479  7480  1089  7481 0
 7478  7479  7480  1089 -7482 0
 7478  7479  7480  1089  7483 0

c  -1-1 --> -2
c    ( b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧  b^{3, 363}_0 ∧ -p_1089) -> ( b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0)
c  in CNF:
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨  b^{3, 364}_2
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨  b^{3, 364}_1
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨  p_1089 ∨ -b^{3, 364}_0
c  in DIMACS:
-7478  7479 -7480  1089  7481 0
-7478  7479 -7480  1089  7482 0
-7478  7479 -7480  1089 -7483 0

c  -2-1 --> break 
c    ( b^{3, 363}_2 ∧  b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨  b^{3, 363}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-7478 -7479  7480  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 363}_2 ∧ -b^{3, 363}_1 ∧ -b^{3, 363}_0 ∧ true) 
c  in CNF:
c    -b^{3, 363}_2 ∨  b^{3, 363}_1 ∨  b^{3, 363}_0 ∨ false 
c  in DIMACS:
-7478  7479  7480  0

c  3 does not represent an automaton state.
c    -(-b^{3, 363}_2 ∧  b^{3, 363}_1 ∧  b^{3, 363}_0 ∧ true) 
c  in CNF:
c     b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ false 
c  in DIMACS:
 7478 -7479 -7480  0
c  -3 does not represent an automaton state.
c    -( b^{3, 363}_2 ∧  b^{3, 363}_1 ∧  b^{3, 363}_0 ∧ true) 
c  in CNF:
c    -b^{3, 363}_2 ∨ -b^{3, 363}_1 ∨ -b^{3, 363}_0 ∨ false 
c  in DIMACS:
-7478 -7479 -7480  0

c i = 364
c  -2+1 --> -1
c    ( b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧  p_1092) -> ( b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0)
c  in CNF:
c    -b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨  b^{3, 365}_2
c    -b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_1
c    -b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨  b^{3, 365}_0
c  in DIMACS:
-7481 -7482  7483 -1092  7484 0
-7481 -7482  7483 -1092 -7485 0
-7481 -7482  7483 -1092  7486 0

c  -1+1 --> 0
c    ( b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0 ∧  p_1092) -> (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧ -b^{3, 365}_0)
c  in CNF:
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_2
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_1
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_0
c  in DIMACS:
-7481  7482 -7483 -1092 -7484 0
-7481  7482 -7483 -1092 -7485 0
-7481  7482 -7483 -1092 -7486 0

c  0+1 --> 1
c    (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧  p_1092) -> (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0)
c  in CNF:
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_2
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_1
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨  b^{3, 365}_0
c  in DIMACS:
 7481  7482  7483 -1092 -7484 0
 7481  7482  7483 -1092 -7485 0
 7481  7482  7483 -1092  7486 0

c  1+1 --> 2
c    (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0 ∧  p_1092) -> (-b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0)
c  in CNF:
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_2
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨  b^{3, 365}_1
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ -p_1092 ∨ -b^{3, 365}_0
c  in DIMACS:
 7481  7482 -7483 -1092 -7484 0
 7481  7482 -7483 -1092  7485 0
 7481  7482 -7483 -1092 -7486 0

c  2+1 --> break 
c    (-b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 7481 -7482  7483 -1092 1162 0


c  2-1 --> 1
c    (-b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧ -p_1092) -> (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0)
c  in CNF:
c     b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_2
c     b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_1
c     b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨  b^{3, 365}_0
c  in DIMACS:
 7481 -7482  7483  1092 -7484 0
 7481 -7482  7483  1092 -7485 0
 7481 -7482  7483  1092  7486 0

c  1-1 --> 0
c    (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0 ∧ -p_1092) -> (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧ -b^{3, 365}_0)
c  in CNF:
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_2
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_1
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_0
c  in DIMACS:
 7481  7482 -7483  1092 -7484 0
 7481  7482 -7483  1092 -7485 0
 7481  7482 -7483  1092 -7486 0

c  0-1 --> -1
c    (-b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧ -p_1092) -> ( b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0)
c  in CNF:
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨  b^{3, 365}_2
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_1
c     b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨  b^{3, 365}_0
c  in DIMACS:
 7481  7482  7483  1092  7484 0
 7481  7482  7483  1092 -7485 0
 7481  7482  7483  1092  7486 0

c  -1-1 --> -2
c    ( b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧  b^{3, 364}_0 ∧ -p_1092) -> ( b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0)
c  in CNF:
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨  b^{3, 365}_2
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨  b^{3, 365}_1
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨  p_1092 ∨ -b^{3, 365}_0
c  in DIMACS:
-7481  7482 -7483  1092  7484 0
-7481  7482 -7483  1092  7485 0
-7481  7482 -7483  1092 -7486 0

c  -2-1 --> break 
c    ( b^{3, 364}_2 ∧  b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨  b^{3, 364}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-7481 -7482  7483  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 364}_2 ∧ -b^{3, 364}_1 ∧ -b^{3, 364}_0 ∧ true) 
c  in CNF:
c    -b^{3, 364}_2 ∨  b^{3, 364}_1 ∨  b^{3, 364}_0 ∨ false 
c  in DIMACS:
-7481  7482  7483  0

c  3 does not represent an automaton state.
c    -(-b^{3, 364}_2 ∧  b^{3, 364}_1 ∧  b^{3, 364}_0 ∧ true) 
c  in CNF:
c     b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ false 
c  in DIMACS:
 7481 -7482 -7483  0
c  -3 does not represent an automaton state.
c    -( b^{3, 364}_2 ∧  b^{3, 364}_1 ∧  b^{3, 364}_0 ∧ true) 
c  in CNF:
c    -b^{3, 364}_2 ∨ -b^{3, 364}_1 ∨ -b^{3, 364}_0 ∨ false 
c  in DIMACS:
-7481 -7482 -7483  0

c i = 365
c  -2+1 --> -1
c    ( b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧  p_1095) -> ( b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0)
c  in CNF:
c    -b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨  b^{3, 366}_2
c    -b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_1
c    -b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨  b^{3, 366}_0
c  in DIMACS:
-7484 -7485  7486 -1095  7487 0
-7484 -7485  7486 -1095 -7488 0
-7484 -7485  7486 -1095  7489 0

c  -1+1 --> 0
c    ( b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0 ∧  p_1095) -> (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧ -b^{3, 366}_0)
c  in CNF:
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_2
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_1
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_0
c  in DIMACS:
-7484  7485 -7486 -1095 -7487 0
-7484  7485 -7486 -1095 -7488 0
-7484  7485 -7486 -1095 -7489 0

c  0+1 --> 1
c    (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧  p_1095) -> (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0)
c  in CNF:
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_2
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_1
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨  b^{3, 366}_0
c  in DIMACS:
 7484  7485  7486 -1095 -7487 0
 7484  7485  7486 -1095 -7488 0
 7484  7485  7486 -1095  7489 0

c  1+1 --> 2
c    (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0 ∧  p_1095) -> (-b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0)
c  in CNF:
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_2
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨  b^{3, 366}_1
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ -p_1095 ∨ -b^{3, 366}_0
c  in DIMACS:
 7484  7485 -7486 -1095 -7487 0
 7484  7485 -7486 -1095  7488 0
 7484  7485 -7486 -1095 -7489 0

c  2+1 --> break 
c    (-b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 7484 -7485  7486 -1095 1162 0


c  2-1 --> 1
c    (-b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧ -p_1095) -> (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0)
c  in CNF:
c     b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_2
c     b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_1
c     b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨  b^{3, 366}_0
c  in DIMACS:
 7484 -7485  7486  1095 -7487 0
 7484 -7485  7486  1095 -7488 0
 7484 -7485  7486  1095  7489 0

c  1-1 --> 0
c    (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0 ∧ -p_1095) -> (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧ -b^{3, 366}_0)
c  in CNF:
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_2
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_1
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_0
c  in DIMACS:
 7484  7485 -7486  1095 -7487 0
 7484  7485 -7486  1095 -7488 0
 7484  7485 -7486  1095 -7489 0

c  0-1 --> -1
c    (-b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧ -p_1095) -> ( b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0)
c  in CNF:
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨  b^{3, 366}_2
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_1
c     b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨  b^{3, 366}_0
c  in DIMACS:
 7484  7485  7486  1095  7487 0
 7484  7485  7486  1095 -7488 0
 7484  7485  7486  1095  7489 0

c  -1-1 --> -2
c    ( b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧  b^{3, 365}_0 ∧ -p_1095) -> ( b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0)
c  in CNF:
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨  b^{3, 366}_2
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨  b^{3, 366}_1
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨  p_1095 ∨ -b^{3, 366}_0
c  in DIMACS:
-7484  7485 -7486  1095  7487 0
-7484  7485 -7486  1095  7488 0
-7484  7485 -7486  1095 -7489 0

c  -2-1 --> break 
c    ( b^{3, 365}_2 ∧  b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨  b^{3, 365}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-7484 -7485  7486  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 365}_2 ∧ -b^{3, 365}_1 ∧ -b^{3, 365}_0 ∧ true) 
c  in CNF:
c    -b^{3, 365}_2 ∨  b^{3, 365}_1 ∨  b^{3, 365}_0 ∨ false 
c  in DIMACS:
-7484  7485  7486  0

c  3 does not represent an automaton state.
c    -(-b^{3, 365}_2 ∧  b^{3, 365}_1 ∧  b^{3, 365}_0 ∧ true) 
c  in CNF:
c     b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ false 
c  in DIMACS:
 7484 -7485 -7486  0
c  -3 does not represent an automaton state.
c    -( b^{3, 365}_2 ∧  b^{3, 365}_1 ∧  b^{3, 365}_0 ∧ true) 
c  in CNF:
c    -b^{3, 365}_2 ∨ -b^{3, 365}_1 ∨ -b^{3, 365}_0 ∨ false 
c  in DIMACS:
-7484 -7485 -7486  0

c i = 366
c  -2+1 --> -1
c    ( b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧  p_1098) -> ( b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0)
c  in CNF:
c    -b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨  b^{3, 367}_2
c    -b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_1
c    -b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨  b^{3, 367}_0
c  in DIMACS:
-7487 -7488  7489 -1098  7490 0
-7487 -7488  7489 -1098 -7491 0
-7487 -7488  7489 -1098  7492 0

c  -1+1 --> 0
c    ( b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0 ∧  p_1098) -> (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧ -b^{3, 367}_0)
c  in CNF:
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_2
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_1
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_0
c  in DIMACS:
-7487  7488 -7489 -1098 -7490 0
-7487  7488 -7489 -1098 -7491 0
-7487  7488 -7489 -1098 -7492 0

c  0+1 --> 1
c    (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧  p_1098) -> (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0)
c  in CNF:
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_2
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_1
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨  b^{3, 367}_0
c  in DIMACS:
 7487  7488  7489 -1098 -7490 0
 7487  7488  7489 -1098 -7491 0
 7487  7488  7489 -1098  7492 0

c  1+1 --> 2
c    (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0 ∧  p_1098) -> (-b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0)
c  in CNF:
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_2
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨  b^{3, 367}_1
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ -p_1098 ∨ -b^{3, 367}_0
c  in DIMACS:
 7487  7488 -7489 -1098 -7490 0
 7487  7488 -7489 -1098  7491 0
 7487  7488 -7489 -1098 -7492 0

c  2+1 --> break 
c    (-b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 7487 -7488  7489 -1098 1162 0


c  2-1 --> 1
c    (-b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧ -p_1098) -> (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0)
c  in CNF:
c     b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_2
c     b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_1
c     b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨  b^{3, 367}_0
c  in DIMACS:
 7487 -7488  7489  1098 -7490 0
 7487 -7488  7489  1098 -7491 0
 7487 -7488  7489  1098  7492 0

c  1-1 --> 0
c    (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0 ∧ -p_1098) -> (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧ -b^{3, 367}_0)
c  in CNF:
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_2
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_1
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_0
c  in DIMACS:
 7487  7488 -7489  1098 -7490 0
 7487  7488 -7489  1098 -7491 0
 7487  7488 -7489  1098 -7492 0

c  0-1 --> -1
c    (-b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧ -p_1098) -> ( b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0)
c  in CNF:
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨  b^{3, 367}_2
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_1
c     b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨  b^{3, 367}_0
c  in DIMACS:
 7487  7488  7489  1098  7490 0
 7487  7488  7489  1098 -7491 0
 7487  7488  7489  1098  7492 0

c  -1-1 --> -2
c    ( b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧  b^{3, 366}_0 ∧ -p_1098) -> ( b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0)
c  in CNF:
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨  b^{3, 367}_2
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨  b^{3, 367}_1
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨  p_1098 ∨ -b^{3, 367}_0
c  in DIMACS:
-7487  7488 -7489  1098  7490 0
-7487  7488 -7489  1098  7491 0
-7487  7488 -7489  1098 -7492 0

c  -2-1 --> break 
c    ( b^{3, 366}_2 ∧  b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨  b^{3, 366}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-7487 -7488  7489  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 366}_2 ∧ -b^{3, 366}_1 ∧ -b^{3, 366}_0 ∧ true) 
c  in CNF:
c    -b^{3, 366}_2 ∨  b^{3, 366}_1 ∨  b^{3, 366}_0 ∨ false 
c  in DIMACS:
-7487  7488  7489  0

c  3 does not represent an automaton state.
c    -(-b^{3, 366}_2 ∧  b^{3, 366}_1 ∧  b^{3, 366}_0 ∧ true) 
c  in CNF:
c     b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ false 
c  in DIMACS:
 7487 -7488 -7489  0
c  -3 does not represent an automaton state.
c    -( b^{3, 366}_2 ∧  b^{3, 366}_1 ∧  b^{3, 366}_0 ∧ true) 
c  in CNF:
c    -b^{3, 366}_2 ∨ -b^{3, 366}_1 ∨ -b^{3, 366}_0 ∨ false 
c  in DIMACS:
-7487 -7488 -7489  0

c i = 367
c  -2+1 --> -1
c    ( b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧  p_1101) -> ( b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0)
c  in CNF:
c    -b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨  b^{3, 368}_2
c    -b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_1
c    -b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨  b^{3, 368}_0
c  in DIMACS:
-7490 -7491  7492 -1101  7493 0
-7490 -7491  7492 -1101 -7494 0
-7490 -7491  7492 -1101  7495 0

c  -1+1 --> 0
c    ( b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0 ∧  p_1101) -> (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧ -b^{3, 368}_0)
c  in CNF:
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_2
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_1
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_0
c  in DIMACS:
-7490  7491 -7492 -1101 -7493 0
-7490  7491 -7492 -1101 -7494 0
-7490  7491 -7492 -1101 -7495 0

c  0+1 --> 1
c    (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧  p_1101) -> (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0)
c  in CNF:
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_2
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_1
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨  b^{3, 368}_0
c  in DIMACS:
 7490  7491  7492 -1101 -7493 0
 7490  7491  7492 -1101 -7494 0
 7490  7491  7492 -1101  7495 0

c  1+1 --> 2
c    (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0 ∧  p_1101) -> (-b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0)
c  in CNF:
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_2
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨  b^{3, 368}_1
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ -p_1101 ∨ -b^{3, 368}_0
c  in DIMACS:
 7490  7491 -7492 -1101 -7493 0
 7490  7491 -7492 -1101  7494 0
 7490  7491 -7492 -1101 -7495 0

c  2+1 --> break 
c    (-b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧  p_1101) -> break
c  in CNF:
c     b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ -p_1101 ∨ break
c  in DIMACS:
 7490 -7491  7492 -1101 1162 0


c  2-1 --> 1
c    (-b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧ -p_1101) -> (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0)
c  in CNF:
c     b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_2
c     b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_1
c     b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨  b^{3, 368}_0
c  in DIMACS:
 7490 -7491  7492  1101 -7493 0
 7490 -7491  7492  1101 -7494 0
 7490 -7491  7492  1101  7495 0

c  1-1 --> 0
c    (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0 ∧ -p_1101) -> (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧ -b^{3, 368}_0)
c  in CNF:
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_2
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_1
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_0
c  in DIMACS:
 7490  7491 -7492  1101 -7493 0
 7490  7491 -7492  1101 -7494 0
 7490  7491 -7492  1101 -7495 0

c  0-1 --> -1
c    (-b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧ -p_1101) -> ( b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0)
c  in CNF:
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨  b^{3, 368}_2
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_1
c     b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨  b^{3, 368}_0
c  in DIMACS:
 7490  7491  7492  1101  7493 0
 7490  7491  7492  1101 -7494 0
 7490  7491  7492  1101  7495 0

c  -1-1 --> -2
c    ( b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧  b^{3, 367}_0 ∧ -p_1101) -> ( b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0)
c  in CNF:
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨  b^{3, 368}_2
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨  b^{3, 368}_1
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨  p_1101 ∨ -b^{3, 368}_0
c  in DIMACS:
-7490  7491 -7492  1101  7493 0
-7490  7491 -7492  1101  7494 0
-7490  7491 -7492  1101 -7495 0

c  -2-1 --> break 
c    ( b^{3, 367}_2 ∧  b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧ -p_1101) -> break
c  in CNF:
c    -b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨  b^{3, 367}_0 ∨  p_1101 ∨ break
c  in DIMACS:
-7490 -7491  7492  1101 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 367}_2 ∧ -b^{3, 367}_1 ∧ -b^{3, 367}_0 ∧ true) 
c  in CNF:
c    -b^{3, 367}_2 ∨  b^{3, 367}_1 ∨  b^{3, 367}_0 ∨ false 
c  in DIMACS:
-7490  7491  7492  0

c  3 does not represent an automaton state.
c    -(-b^{3, 367}_2 ∧  b^{3, 367}_1 ∧  b^{3, 367}_0 ∧ true) 
c  in CNF:
c     b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ false 
c  in DIMACS:
 7490 -7491 -7492  0
c  -3 does not represent an automaton state.
c    -( b^{3, 367}_2 ∧  b^{3, 367}_1 ∧  b^{3, 367}_0 ∧ true) 
c  in CNF:
c    -b^{3, 367}_2 ∨ -b^{3, 367}_1 ∨ -b^{3, 367}_0 ∨ false 
c  in DIMACS:
-7490 -7491 -7492  0

c i = 368
c  -2+1 --> -1
c    ( b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧  p_1104) -> ( b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0)
c  in CNF:
c    -b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨  b^{3, 369}_2
c    -b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_1
c    -b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨  b^{3, 369}_0
c  in DIMACS:
-7493 -7494  7495 -1104  7496 0
-7493 -7494  7495 -1104 -7497 0
-7493 -7494  7495 -1104  7498 0

c  -1+1 --> 0
c    ( b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0 ∧  p_1104) -> (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧ -b^{3, 369}_0)
c  in CNF:
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_2
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_1
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_0
c  in DIMACS:
-7493  7494 -7495 -1104 -7496 0
-7493  7494 -7495 -1104 -7497 0
-7493  7494 -7495 -1104 -7498 0

c  0+1 --> 1
c    (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧  p_1104) -> (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0)
c  in CNF:
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_2
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_1
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨  b^{3, 369}_0
c  in DIMACS:
 7493  7494  7495 -1104 -7496 0
 7493  7494  7495 -1104 -7497 0
 7493  7494  7495 -1104  7498 0

c  1+1 --> 2
c    (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0 ∧  p_1104) -> (-b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0)
c  in CNF:
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_2
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨  b^{3, 369}_1
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ -p_1104 ∨ -b^{3, 369}_0
c  in DIMACS:
 7493  7494 -7495 -1104 -7496 0
 7493  7494 -7495 -1104  7497 0
 7493  7494 -7495 -1104 -7498 0

c  2+1 --> break 
c    (-b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 7493 -7494  7495 -1104 1162 0


c  2-1 --> 1
c    (-b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧ -p_1104) -> (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0)
c  in CNF:
c     b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_2
c     b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_1
c     b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨  b^{3, 369}_0
c  in DIMACS:
 7493 -7494  7495  1104 -7496 0
 7493 -7494  7495  1104 -7497 0
 7493 -7494  7495  1104  7498 0

c  1-1 --> 0
c    (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0 ∧ -p_1104) -> (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧ -b^{3, 369}_0)
c  in CNF:
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_2
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_1
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_0
c  in DIMACS:
 7493  7494 -7495  1104 -7496 0
 7493  7494 -7495  1104 -7497 0
 7493  7494 -7495  1104 -7498 0

c  0-1 --> -1
c    (-b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧ -p_1104) -> ( b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0)
c  in CNF:
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨  b^{3, 369}_2
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_1
c     b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨  b^{3, 369}_0
c  in DIMACS:
 7493  7494  7495  1104  7496 0
 7493  7494  7495  1104 -7497 0
 7493  7494  7495  1104  7498 0

c  -1-1 --> -2
c    ( b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧  b^{3, 368}_0 ∧ -p_1104) -> ( b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0)
c  in CNF:
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨  b^{3, 369}_2
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨  b^{3, 369}_1
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨  p_1104 ∨ -b^{3, 369}_0
c  in DIMACS:
-7493  7494 -7495  1104  7496 0
-7493  7494 -7495  1104  7497 0
-7493  7494 -7495  1104 -7498 0

c  -2-1 --> break 
c    ( b^{3, 368}_2 ∧  b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨  b^{3, 368}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-7493 -7494  7495  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 368}_2 ∧ -b^{3, 368}_1 ∧ -b^{3, 368}_0 ∧ true) 
c  in CNF:
c    -b^{3, 368}_2 ∨  b^{3, 368}_1 ∨  b^{3, 368}_0 ∨ false 
c  in DIMACS:
-7493  7494  7495  0

c  3 does not represent an automaton state.
c    -(-b^{3, 368}_2 ∧  b^{3, 368}_1 ∧  b^{3, 368}_0 ∧ true) 
c  in CNF:
c     b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ false 
c  in DIMACS:
 7493 -7494 -7495  0
c  -3 does not represent an automaton state.
c    -( b^{3, 368}_2 ∧  b^{3, 368}_1 ∧  b^{3, 368}_0 ∧ true) 
c  in CNF:
c    -b^{3, 368}_2 ∨ -b^{3, 368}_1 ∨ -b^{3, 368}_0 ∨ false 
c  in DIMACS:
-7493 -7494 -7495  0

c i = 369
c  -2+1 --> -1
c    ( b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧  p_1107) -> ( b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0)
c  in CNF:
c    -b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨  b^{3, 370}_2
c    -b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_1
c    -b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨  b^{3, 370}_0
c  in DIMACS:
-7496 -7497  7498 -1107  7499 0
-7496 -7497  7498 -1107 -7500 0
-7496 -7497  7498 -1107  7501 0

c  -1+1 --> 0
c    ( b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0 ∧  p_1107) -> (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧ -b^{3, 370}_0)
c  in CNF:
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_2
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_1
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_0
c  in DIMACS:
-7496  7497 -7498 -1107 -7499 0
-7496  7497 -7498 -1107 -7500 0
-7496  7497 -7498 -1107 -7501 0

c  0+1 --> 1
c    (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧  p_1107) -> (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0)
c  in CNF:
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_2
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_1
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨  b^{3, 370}_0
c  in DIMACS:
 7496  7497  7498 -1107 -7499 0
 7496  7497  7498 -1107 -7500 0
 7496  7497  7498 -1107  7501 0

c  1+1 --> 2
c    (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0 ∧  p_1107) -> (-b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0)
c  in CNF:
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_2
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨  b^{3, 370}_1
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ -p_1107 ∨ -b^{3, 370}_0
c  in DIMACS:
 7496  7497 -7498 -1107 -7499 0
 7496  7497 -7498 -1107  7500 0
 7496  7497 -7498 -1107 -7501 0

c  2+1 --> break 
c    (-b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 7496 -7497  7498 -1107 1162 0


c  2-1 --> 1
c    (-b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧ -p_1107) -> (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0)
c  in CNF:
c     b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_2
c     b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_1
c     b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨  b^{3, 370}_0
c  in DIMACS:
 7496 -7497  7498  1107 -7499 0
 7496 -7497  7498  1107 -7500 0
 7496 -7497  7498  1107  7501 0

c  1-1 --> 0
c    (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0 ∧ -p_1107) -> (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧ -b^{3, 370}_0)
c  in CNF:
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_2
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_1
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_0
c  in DIMACS:
 7496  7497 -7498  1107 -7499 0
 7496  7497 -7498  1107 -7500 0
 7496  7497 -7498  1107 -7501 0

c  0-1 --> -1
c    (-b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧ -p_1107) -> ( b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0)
c  in CNF:
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨  b^{3, 370}_2
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_1
c     b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨  b^{3, 370}_0
c  in DIMACS:
 7496  7497  7498  1107  7499 0
 7496  7497  7498  1107 -7500 0
 7496  7497  7498  1107  7501 0

c  -1-1 --> -2
c    ( b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧  b^{3, 369}_0 ∧ -p_1107) -> ( b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0)
c  in CNF:
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨  b^{3, 370}_2
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨  b^{3, 370}_1
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨  p_1107 ∨ -b^{3, 370}_0
c  in DIMACS:
-7496  7497 -7498  1107  7499 0
-7496  7497 -7498  1107  7500 0
-7496  7497 -7498  1107 -7501 0

c  -2-1 --> break 
c    ( b^{3, 369}_2 ∧  b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨  b^{3, 369}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-7496 -7497  7498  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 369}_2 ∧ -b^{3, 369}_1 ∧ -b^{3, 369}_0 ∧ true) 
c  in CNF:
c    -b^{3, 369}_2 ∨  b^{3, 369}_1 ∨  b^{3, 369}_0 ∨ false 
c  in DIMACS:
-7496  7497  7498  0

c  3 does not represent an automaton state.
c    -(-b^{3, 369}_2 ∧  b^{3, 369}_1 ∧  b^{3, 369}_0 ∧ true) 
c  in CNF:
c     b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ false 
c  in DIMACS:
 7496 -7497 -7498  0
c  -3 does not represent an automaton state.
c    -( b^{3, 369}_2 ∧  b^{3, 369}_1 ∧  b^{3, 369}_0 ∧ true) 
c  in CNF:
c    -b^{3, 369}_2 ∨ -b^{3, 369}_1 ∨ -b^{3, 369}_0 ∨ false 
c  in DIMACS:
-7496 -7497 -7498  0

c i = 370
c  -2+1 --> -1
c    ( b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧  p_1110) -> ( b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0)
c  in CNF:
c    -b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨  b^{3, 371}_2
c    -b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_1
c    -b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨  b^{3, 371}_0
c  in DIMACS:
-7499 -7500  7501 -1110  7502 0
-7499 -7500  7501 -1110 -7503 0
-7499 -7500  7501 -1110  7504 0

c  -1+1 --> 0
c    ( b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0 ∧  p_1110) -> (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧ -b^{3, 371}_0)
c  in CNF:
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_2
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_1
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_0
c  in DIMACS:
-7499  7500 -7501 -1110 -7502 0
-7499  7500 -7501 -1110 -7503 0
-7499  7500 -7501 -1110 -7504 0

c  0+1 --> 1
c    (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧  p_1110) -> (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0)
c  in CNF:
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_2
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_1
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨  b^{3, 371}_0
c  in DIMACS:
 7499  7500  7501 -1110 -7502 0
 7499  7500  7501 -1110 -7503 0
 7499  7500  7501 -1110  7504 0

c  1+1 --> 2
c    (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0 ∧  p_1110) -> (-b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0)
c  in CNF:
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_2
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨  b^{3, 371}_1
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ -p_1110 ∨ -b^{3, 371}_0
c  in DIMACS:
 7499  7500 -7501 -1110 -7502 0
 7499  7500 -7501 -1110  7503 0
 7499  7500 -7501 -1110 -7504 0

c  2+1 --> break 
c    (-b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 7499 -7500  7501 -1110 1162 0


c  2-1 --> 1
c    (-b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧ -p_1110) -> (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0)
c  in CNF:
c     b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_2
c     b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_1
c     b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨  b^{3, 371}_0
c  in DIMACS:
 7499 -7500  7501  1110 -7502 0
 7499 -7500  7501  1110 -7503 0
 7499 -7500  7501  1110  7504 0

c  1-1 --> 0
c    (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0 ∧ -p_1110) -> (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧ -b^{3, 371}_0)
c  in CNF:
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_2
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_1
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_0
c  in DIMACS:
 7499  7500 -7501  1110 -7502 0
 7499  7500 -7501  1110 -7503 0
 7499  7500 -7501  1110 -7504 0

c  0-1 --> -1
c    (-b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧ -p_1110) -> ( b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0)
c  in CNF:
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨  b^{3, 371}_2
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_1
c     b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨  b^{3, 371}_0
c  in DIMACS:
 7499  7500  7501  1110  7502 0
 7499  7500  7501  1110 -7503 0
 7499  7500  7501  1110  7504 0

c  -1-1 --> -2
c    ( b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧  b^{3, 370}_0 ∧ -p_1110) -> ( b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0)
c  in CNF:
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨  b^{3, 371}_2
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨  b^{3, 371}_1
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨  p_1110 ∨ -b^{3, 371}_0
c  in DIMACS:
-7499  7500 -7501  1110  7502 0
-7499  7500 -7501  1110  7503 0
-7499  7500 -7501  1110 -7504 0

c  -2-1 --> break 
c    ( b^{3, 370}_2 ∧  b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨  b^{3, 370}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-7499 -7500  7501  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 370}_2 ∧ -b^{3, 370}_1 ∧ -b^{3, 370}_0 ∧ true) 
c  in CNF:
c    -b^{3, 370}_2 ∨  b^{3, 370}_1 ∨  b^{3, 370}_0 ∨ false 
c  in DIMACS:
-7499  7500  7501  0

c  3 does not represent an automaton state.
c    -(-b^{3, 370}_2 ∧  b^{3, 370}_1 ∧  b^{3, 370}_0 ∧ true) 
c  in CNF:
c     b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ false 
c  in DIMACS:
 7499 -7500 -7501  0
c  -3 does not represent an automaton state.
c    -( b^{3, 370}_2 ∧  b^{3, 370}_1 ∧  b^{3, 370}_0 ∧ true) 
c  in CNF:
c    -b^{3, 370}_2 ∨ -b^{3, 370}_1 ∨ -b^{3, 370}_0 ∨ false 
c  in DIMACS:
-7499 -7500 -7501  0

c i = 371
c  -2+1 --> -1
c    ( b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧  p_1113) -> ( b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0)
c  in CNF:
c    -b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨  b^{3, 372}_2
c    -b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_1
c    -b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨  b^{3, 372}_0
c  in DIMACS:
-7502 -7503  7504 -1113  7505 0
-7502 -7503  7504 -1113 -7506 0
-7502 -7503  7504 -1113  7507 0

c  -1+1 --> 0
c    ( b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0 ∧  p_1113) -> (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧ -b^{3, 372}_0)
c  in CNF:
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_2
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_1
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_0
c  in DIMACS:
-7502  7503 -7504 -1113 -7505 0
-7502  7503 -7504 -1113 -7506 0
-7502  7503 -7504 -1113 -7507 0

c  0+1 --> 1
c    (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧  p_1113) -> (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0)
c  in CNF:
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_2
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_1
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨  b^{3, 372}_0
c  in DIMACS:
 7502  7503  7504 -1113 -7505 0
 7502  7503  7504 -1113 -7506 0
 7502  7503  7504 -1113  7507 0

c  1+1 --> 2
c    (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0 ∧  p_1113) -> (-b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0)
c  in CNF:
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_2
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨  b^{3, 372}_1
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ -p_1113 ∨ -b^{3, 372}_0
c  in DIMACS:
 7502  7503 -7504 -1113 -7505 0
 7502  7503 -7504 -1113  7506 0
 7502  7503 -7504 -1113 -7507 0

c  2+1 --> break 
c    (-b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 7502 -7503  7504 -1113 1162 0


c  2-1 --> 1
c    (-b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧ -p_1113) -> (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0)
c  in CNF:
c     b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_2
c     b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_1
c     b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨  b^{3, 372}_0
c  in DIMACS:
 7502 -7503  7504  1113 -7505 0
 7502 -7503  7504  1113 -7506 0
 7502 -7503  7504  1113  7507 0

c  1-1 --> 0
c    (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0 ∧ -p_1113) -> (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧ -b^{3, 372}_0)
c  in CNF:
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_2
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_1
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_0
c  in DIMACS:
 7502  7503 -7504  1113 -7505 0
 7502  7503 -7504  1113 -7506 0
 7502  7503 -7504  1113 -7507 0

c  0-1 --> -1
c    (-b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧ -p_1113) -> ( b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0)
c  in CNF:
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨  b^{3, 372}_2
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_1
c     b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨  b^{3, 372}_0
c  in DIMACS:
 7502  7503  7504  1113  7505 0
 7502  7503  7504  1113 -7506 0
 7502  7503  7504  1113  7507 0

c  -1-1 --> -2
c    ( b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧  b^{3, 371}_0 ∧ -p_1113) -> ( b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0)
c  in CNF:
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨  b^{3, 372}_2
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨  b^{3, 372}_1
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨  p_1113 ∨ -b^{3, 372}_0
c  in DIMACS:
-7502  7503 -7504  1113  7505 0
-7502  7503 -7504  1113  7506 0
-7502  7503 -7504  1113 -7507 0

c  -2-1 --> break 
c    ( b^{3, 371}_2 ∧  b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨  b^{3, 371}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-7502 -7503  7504  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 371}_2 ∧ -b^{3, 371}_1 ∧ -b^{3, 371}_0 ∧ true) 
c  in CNF:
c    -b^{3, 371}_2 ∨  b^{3, 371}_1 ∨  b^{3, 371}_0 ∨ false 
c  in DIMACS:
-7502  7503  7504  0

c  3 does not represent an automaton state.
c    -(-b^{3, 371}_2 ∧  b^{3, 371}_1 ∧  b^{3, 371}_0 ∧ true) 
c  in CNF:
c     b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ false 
c  in DIMACS:
 7502 -7503 -7504  0
c  -3 does not represent an automaton state.
c    -( b^{3, 371}_2 ∧  b^{3, 371}_1 ∧  b^{3, 371}_0 ∧ true) 
c  in CNF:
c    -b^{3, 371}_2 ∨ -b^{3, 371}_1 ∨ -b^{3, 371}_0 ∨ false 
c  in DIMACS:
-7502 -7503 -7504  0

c i = 372
c  -2+1 --> -1
c    ( b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧  p_1116) -> ( b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0)
c  in CNF:
c    -b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨  b^{3, 373}_2
c    -b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_1
c    -b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨  b^{3, 373}_0
c  in DIMACS:
-7505 -7506  7507 -1116  7508 0
-7505 -7506  7507 -1116 -7509 0
-7505 -7506  7507 -1116  7510 0

c  -1+1 --> 0
c    ( b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0 ∧  p_1116) -> (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧ -b^{3, 373}_0)
c  in CNF:
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_2
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_1
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_0
c  in DIMACS:
-7505  7506 -7507 -1116 -7508 0
-7505  7506 -7507 -1116 -7509 0
-7505  7506 -7507 -1116 -7510 0

c  0+1 --> 1
c    (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧  p_1116) -> (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0)
c  in CNF:
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_2
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_1
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨  b^{3, 373}_0
c  in DIMACS:
 7505  7506  7507 -1116 -7508 0
 7505  7506  7507 -1116 -7509 0
 7505  7506  7507 -1116  7510 0

c  1+1 --> 2
c    (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0 ∧  p_1116) -> (-b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0)
c  in CNF:
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_2
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨  b^{3, 373}_1
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ -p_1116 ∨ -b^{3, 373}_0
c  in DIMACS:
 7505  7506 -7507 -1116 -7508 0
 7505  7506 -7507 -1116  7509 0
 7505  7506 -7507 -1116 -7510 0

c  2+1 --> break 
c    (-b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 7505 -7506  7507 -1116 1162 0


c  2-1 --> 1
c    (-b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧ -p_1116) -> (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0)
c  in CNF:
c     b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_2
c     b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_1
c     b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨  b^{3, 373}_0
c  in DIMACS:
 7505 -7506  7507  1116 -7508 0
 7505 -7506  7507  1116 -7509 0
 7505 -7506  7507  1116  7510 0

c  1-1 --> 0
c    (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0 ∧ -p_1116) -> (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧ -b^{3, 373}_0)
c  in CNF:
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_2
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_1
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_0
c  in DIMACS:
 7505  7506 -7507  1116 -7508 0
 7505  7506 -7507  1116 -7509 0
 7505  7506 -7507  1116 -7510 0

c  0-1 --> -1
c    (-b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧ -p_1116) -> ( b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0)
c  in CNF:
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨  b^{3, 373}_2
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_1
c     b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨  b^{3, 373}_0
c  in DIMACS:
 7505  7506  7507  1116  7508 0
 7505  7506  7507  1116 -7509 0
 7505  7506  7507  1116  7510 0

c  -1-1 --> -2
c    ( b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧  b^{3, 372}_0 ∧ -p_1116) -> ( b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0)
c  in CNF:
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨  b^{3, 373}_2
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨  b^{3, 373}_1
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨  p_1116 ∨ -b^{3, 373}_0
c  in DIMACS:
-7505  7506 -7507  1116  7508 0
-7505  7506 -7507  1116  7509 0
-7505  7506 -7507  1116 -7510 0

c  -2-1 --> break 
c    ( b^{3, 372}_2 ∧  b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨  b^{3, 372}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-7505 -7506  7507  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 372}_2 ∧ -b^{3, 372}_1 ∧ -b^{3, 372}_0 ∧ true) 
c  in CNF:
c    -b^{3, 372}_2 ∨  b^{3, 372}_1 ∨  b^{3, 372}_0 ∨ false 
c  in DIMACS:
-7505  7506  7507  0

c  3 does not represent an automaton state.
c    -(-b^{3, 372}_2 ∧  b^{3, 372}_1 ∧  b^{3, 372}_0 ∧ true) 
c  in CNF:
c     b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ false 
c  in DIMACS:
 7505 -7506 -7507  0
c  -3 does not represent an automaton state.
c    -( b^{3, 372}_2 ∧  b^{3, 372}_1 ∧  b^{3, 372}_0 ∧ true) 
c  in CNF:
c    -b^{3, 372}_2 ∨ -b^{3, 372}_1 ∨ -b^{3, 372}_0 ∨ false 
c  in DIMACS:
-7505 -7506 -7507  0

c i = 373
c  -2+1 --> -1
c    ( b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧  p_1119) -> ( b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0)
c  in CNF:
c    -b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨  b^{3, 374}_2
c    -b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_1
c    -b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨  b^{3, 374}_0
c  in DIMACS:
-7508 -7509  7510 -1119  7511 0
-7508 -7509  7510 -1119 -7512 0
-7508 -7509  7510 -1119  7513 0

c  -1+1 --> 0
c    ( b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0 ∧  p_1119) -> (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧ -b^{3, 374}_0)
c  in CNF:
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_2
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_1
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_0
c  in DIMACS:
-7508  7509 -7510 -1119 -7511 0
-7508  7509 -7510 -1119 -7512 0
-7508  7509 -7510 -1119 -7513 0

c  0+1 --> 1
c    (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧  p_1119) -> (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0)
c  in CNF:
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_2
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_1
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨  b^{3, 374}_0
c  in DIMACS:
 7508  7509  7510 -1119 -7511 0
 7508  7509  7510 -1119 -7512 0
 7508  7509  7510 -1119  7513 0

c  1+1 --> 2
c    (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0 ∧  p_1119) -> (-b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0)
c  in CNF:
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_2
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨  b^{3, 374}_1
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ -p_1119 ∨ -b^{3, 374}_0
c  in DIMACS:
 7508  7509 -7510 -1119 -7511 0
 7508  7509 -7510 -1119  7512 0
 7508  7509 -7510 -1119 -7513 0

c  2+1 --> break 
c    (-b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧  p_1119) -> break
c  in CNF:
c     b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ -p_1119 ∨ break
c  in DIMACS:
 7508 -7509  7510 -1119 1162 0


c  2-1 --> 1
c    (-b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧ -p_1119) -> (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0)
c  in CNF:
c     b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_2
c     b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_1
c     b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨  b^{3, 374}_0
c  in DIMACS:
 7508 -7509  7510  1119 -7511 0
 7508 -7509  7510  1119 -7512 0
 7508 -7509  7510  1119  7513 0

c  1-1 --> 0
c    (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0 ∧ -p_1119) -> (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧ -b^{3, 374}_0)
c  in CNF:
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_2
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_1
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_0
c  in DIMACS:
 7508  7509 -7510  1119 -7511 0
 7508  7509 -7510  1119 -7512 0
 7508  7509 -7510  1119 -7513 0

c  0-1 --> -1
c    (-b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧ -p_1119) -> ( b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0)
c  in CNF:
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨  b^{3, 374}_2
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_1
c     b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨  b^{3, 374}_0
c  in DIMACS:
 7508  7509  7510  1119  7511 0
 7508  7509  7510  1119 -7512 0
 7508  7509  7510  1119  7513 0

c  -1-1 --> -2
c    ( b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧  b^{3, 373}_0 ∧ -p_1119) -> ( b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0)
c  in CNF:
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨  b^{3, 374}_2
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨  b^{3, 374}_1
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨  p_1119 ∨ -b^{3, 374}_0
c  in DIMACS:
-7508  7509 -7510  1119  7511 0
-7508  7509 -7510  1119  7512 0
-7508  7509 -7510  1119 -7513 0

c  -2-1 --> break 
c    ( b^{3, 373}_2 ∧  b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧ -p_1119) -> break
c  in CNF:
c    -b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨  b^{3, 373}_0 ∨  p_1119 ∨ break
c  in DIMACS:
-7508 -7509  7510  1119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 373}_2 ∧ -b^{3, 373}_1 ∧ -b^{3, 373}_0 ∧ true) 
c  in CNF:
c    -b^{3, 373}_2 ∨  b^{3, 373}_1 ∨  b^{3, 373}_0 ∨ false 
c  in DIMACS:
-7508  7509  7510  0

c  3 does not represent an automaton state.
c    -(-b^{3, 373}_2 ∧  b^{3, 373}_1 ∧  b^{3, 373}_0 ∧ true) 
c  in CNF:
c     b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ false 
c  in DIMACS:
 7508 -7509 -7510  0
c  -3 does not represent an automaton state.
c    -( b^{3, 373}_2 ∧  b^{3, 373}_1 ∧  b^{3, 373}_0 ∧ true) 
c  in CNF:
c    -b^{3, 373}_2 ∨ -b^{3, 373}_1 ∨ -b^{3, 373}_0 ∨ false 
c  in DIMACS:
-7508 -7509 -7510  0

c i = 374
c  -2+1 --> -1
c    ( b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧  p_1122) -> ( b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0)
c  in CNF:
c    -b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨  b^{3, 375}_2
c    -b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_1
c    -b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨  b^{3, 375}_0
c  in DIMACS:
-7511 -7512  7513 -1122  7514 0
-7511 -7512  7513 -1122 -7515 0
-7511 -7512  7513 -1122  7516 0

c  -1+1 --> 0
c    ( b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0 ∧  p_1122) -> (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧ -b^{3, 375}_0)
c  in CNF:
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_2
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_1
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_0
c  in DIMACS:
-7511  7512 -7513 -1122 -7514 0
-7511  7512 -7513 -1122 -7515 0
-7511  7512 -7513 -1122 -7516 0

c  0+1 --> 1
c    (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧  p_1122) -> (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0)
c  in CNF:
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_2
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_1
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨  b^{3, 375}_0
c  in DIMACS:
 7511  7512  7513 -1122 -7514 0
 7511  7512  7513 -1122 -7515 0
 7511  7512  7513 -1122  7516 0

c  1+1 --> 2
c    (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0 ∧  p_1122) -> (-b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0)
c  in CNF:
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_2
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨  b^{3, 375}_1
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ -p_1122 ∨ -b^{3, 375}_0
c  in DIMACS:
 7511  7512 -7513 -1122 -7514 0
 7511  7512 -7513 -1122  7515 0
 7511  7512 -7513 -1122 -7516 0

c  2+1 --> break 
c    (-b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 7511 -7512  7513 -1122 1162 0


c  2-1 --> 1
c    (-b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧ -p_1122) -> (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0)
c  in CNF:
c     b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_2
c     b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_1
c     b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨  b^{3, 375}_0
c  in DIMACS:
 7511 -7512  7513  1122 -7514 0
 7511 -7512  7513  1122 -7515 0
 7511 -7512  7513  1122  7516 0

c  1-1 --> 0
c    (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0 ∧ -p_1122) -> (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧ -b^{3, 375}_0)
c  in CNF:
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_2
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_1
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_0
c  in DIMACS:
 7511  7512 -7513  1122 -7514 0
 7511  7512 -7513  1122 -7515 0
 7511  7512 -7513  1122 -7516 0

c  0-1 --> -1
c    (-b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧ -p_1122) -> ( b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0)
c  in CNF:
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨  b^{3, 375}_2
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_1
c     b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨  b^{3, 375}_0
c  in DIMACS:
 7511  7512  7513  1122  7514 0
 7511  7512  7513  1122 -7515 0
 7511  7512  7513  1122  7516 0

c  -1-1 --> -2
c    ( b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧  b^{3, 374}_0 ∧ -p_1122) -> ( b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0)
c  in CNF:
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨  b^{3, 375}_2
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨  b^{3, 375}_1
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨  p_1122 ∨ -b^{3, 375}_0
c  in DIMACS:
-7511  7512 -7513  1122  7514 0
-7511  7512 -7513  1122  7515 0
-7511  7512 -7513  1122 -7516 0

c  -2-1 --> break 
c    ( b^{3, 374}_2 ∧  b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨  b^{3, 374}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-7511 -7512  7513  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 374}_2 ∧ -b^{3, 374}_1 ∧ -b^{3, 374}_0 ∧ true) 
c  in CNF:
c    -b^{3, 374}_2 ∨  b^{3, 374}_1 ∨  b^{3, 374}_0 ∨ false 
c  in DIMACS:
-7511  7512  7513  0

c  3 does not represent an automaton state.
c    -(-b^{3, 374}_2 ∧  b^{3, 374}_1 ∧  b^{3, 374}_0 ∧ true) 
c  in CNF:
c     b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ false 
c  in DIMACS:
 7511 -7512 -7513  0
c  -3 does not represent an automaton state.
c    -( b^{3, 374}_2 ∧  b^{3, 374}_1 ∧  b^{3, 374}_0 ∧ true) 
c  in CNF:
c    -b^{3, 374}_2 ∨ -b^{3, 374}_1 ∨ -b^{3, 374}_0 ∨ false 
c  in DIMACS:
-7511 -7512 -7513  0

c i = 375
c  -2+1 --> -1
c    ( b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧  p_1125) -> ( b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0)
c  in CNF:
c    -b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨  b^{3, 376}_2
c    -b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_1
c    -b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨  b^{3, 376}_0
c  in DIMACS:
-7514 -7515  7516 -1125  7517 0
-7514 -7515  7516 -1125 -7518 0
-7514 -7515  7516 -1125  7519 0

c  -1+1 --> 0
c    ( b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0 ∧  p_1125) -> (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧ -b^{3, 376}_0)
c  in CNF:
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_2
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_1
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_0
c  in DIMACS:
-7514  7515 -7516 -1125 -7517 0
-7514  7515 -7516 -1125 -7518 0
-7514  7515 -7516 -1125 -7519 0

c  0+1 --> 1
c    (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧  p_1125) -> (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0)
c  in CNF:
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_2
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_1
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨  b^{3, 376}_0
c  in DIMACS:
 7514  7515  7516 -1125 -7517 0
 7514  7515  7516 -1125 -7518 0
 7514  7515  7516 -1125  7519 0

c  1+1 --> 2
c    (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0 ∧  p_1125) -> (-b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0)
c  in CNF:
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_2
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨  b^{3, 376}_1
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ -p_1125 ∨ -b^{3, 376}_0
c  in DIMACS:
 7514  7515 -7516 -1125 -7517 0
 7514  7515 -7516 -1125  7518 0
 7514  7515 -7516 -1125 -7519 0

c  2+1 --> break 
c    (-b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 7514 -7515  7516 -1125 1162 0


c  2-1 --> 1
c    (-b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧ -p_1125) -> (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0)
c  in CNF:
c     b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_2
c     b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_1
c     b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨  b^{3, 376}_0
c  in DIMACS:
 7514 -7515  7516  1125 -7517 0
 7514 -7515  7516  1125 -7518 0
 7514 -7515  7516  1125  7519 0

c  1-1 --> 0
c    (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0 ∧ -p_1125) -> (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧ -b^{3, 376}_0)
c  in CNF:
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_2
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_1
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_0
c  in DIMACS:
 7514  7515 -7516  1125 -7517 0
 7514  7515 -7516  1125 -7518 0
 7514  7515 -7516  1125 -7519 0

c  0-1 --> -1
c    (-b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧ -p_1125) -> ( b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0)
c  in CNF:
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨  b^{3, 376}_2
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_1
c     b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨  b^{3, 376}_0
c  in DIMACS:
 7514  7515  7516  1125  7517 0
 7514  7515  7516  1125 -7518 0
 7514  7515  7516  1125  7519 0

c  -1-1 --> -2
c    ( b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧  b^{3, 375}_0 ∧ -p_1125) -> ( b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0)
c  in CNF:
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨  b^{3, 376}_2
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨  b^{3, 376}_1
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨  p_1125 ∨ -b^{3, 376}_0
c  in DIMACS:
-7514  7515 -7516  1125  7517 0
-7514  7515 -7516  1125  7518 0
-7514  7515 -7516  1125 -7519 0

c  -2-1 --> break 
c    ( b^{3, 375}_2 ∧  b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨  b^{3, 375}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-7514 -7515  7516  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 375}_2 ∧ -b^{3, 375}_1 ∧ -b^{3, 375}_0 ∧ true) 
c  in CNF:
c    -b^{3, 375}_2 ∨  b^{3, 375}_1 ∨  b^{3, 375}_0 ∨ false 
c  in DIMACS:
-7514  7515  7516  0

c  3 does not represent an automaton state.
c    -(-b^{3, 375}_2 ∧  b^{3, 375}_1 ∧  b^{3, 375}_0 ∧ true) 
c  in CNF:
c     b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ false 
c  in DIMACS:
 7514 -7515 -7516  0
c  -3 does not represent an automaton state.
c    -( b^{3, 375}_2 ∧  b^{3, 375}_1 ∧  b^{3, 375}_0 ∧ true) 
c  in CNF:
c    -b^{3, 375}_2 ∨ -b^{3, 375}_1 ∨ -b^{3, 375}_0 ∨ false 
c  in DIMACS:
-7514 -7515 -7516  0

c i = 376
c  -2+1 --> -1
c    ( b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧  p_1128) -> ( b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0)
c  in CNF:
c    -b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨  b^{3, 377}_2
c    -b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_1
c    -b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨  b^{3, 377}_0
c  in DIMACS:
-7517 -7518  7519 -1128  7520 0
-7517 -7518  7519 -1128 -7521 0
-7517 -7518  7519 -1128  7522 0

c  -1+1 --> 0
c    ( b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0 ∧  p_1128) -> (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧ -b^{3, 377}_0)
c  in CNF:
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_2
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_1
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_0
c  in DIMACS:
-7517  7518 -7519 -1128 -7520 0
-7517  7518 -7519 -1128 -7521 0
-7517  7518 -7519 -1128 -7522 0

c  0+1 --> 1
c    (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧  p_1128) -> (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0)
c  in CNF:
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_2
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_1
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨  b^{3, 377}_0
c  in DIMACS:
 7517  7518  7519 -1128 -7520 0
 7517  7518  7519 -1128 -7521 0
 7517  7518  7519 -1128  7522 0

c  1+1 --> 2
c    (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0 ∧  p_1128) -> (-b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0)
c  in CNF:
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_2
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨  b^{3, 377}_1
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ -p_1128 ∨ -b^{3, 377}_0
c  in DIMACS:
 7517  7518 -7519 -1128 -7520 0
 7517  7518 -7519 -1128  7521 0
 7517  7518 -7519 -1128 -7522 0

c  2+1 --> break 
c    (-b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 7517 -7518  7519 -1128 1162 0


c  2-1 --> 1
c    (-b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧ -p_1128) -> (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0)
c  in CNF:
c     b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_2
c     b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_1
c     b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨  b^{3, 377}_0
c  in DIMACS:
 7517 -7518  7519  1128 -7520 0
 7517 -7518  7519  1128 -7521 0
 7517 -7518  7519  1128  7522 0

c  1-1 --> 0
c    (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0 ∧ -p_1128) -> (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧ -b^{3, 377}_0)
c  in CNF:
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_2
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_1
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_0
c  in DIMACS:
 7517  7518 -7519  1128 -7520 0
 7517  7518 -7519  1128 -7521 0
 7517  7518 -7519  1128 -7522 0

c  0-1 --> -1
c    (-b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧ -p_1128) -> ( b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0)
c  in CNF:
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨  b^{3, 377}_2
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_1
c     b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨  b^{3, 377}_0
c  in DIMACS:
 7517  7518  7519  1128  7520 0
 7517  7518  7519  1128 -7521 0
 7517  7518  7519  1128  7522 0

c  -1-1 --> -2
c    ( b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧  b^{3, 376}_0 ∧ -p_1128) -> ( b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0)
c  in CNF:
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨  b^{3, 377}_2
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨  b^{3, 377}_1
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨  p_1128 ∨ -b^{3, 377}_0
c  in DIMACS:
-7517  7518 -7519  1128  7520 0
-7517  7518 -7519  1128  7521 0
-7517  7518 -7519  1128 -7522 0

c  -2-1 --> break 
c    ( b^{3, 376}_2 ∧  b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨  b^{3, 376}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-7517 -7518  7519  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 376}_2 ∧ -b^{3, 376}_1 ∧ -b^{3, 376}_0 ∧ true) 
c  in CNF:
c    -b^{3, 376}_2 ∨  b^{3, 376}_1 ∨  b^{3, 376}_0 ∨ false 
c  in DIMACS:
-7517  7518  7519  0

c  3 does not represent an automaton state.
c    -(-b^{3, 376}_2 ∧  b^{3, 376}_1 ∧  b^{3, 376}_0 ∧ true) 
c  in CNF:
c     b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ false 
c  in DIMACS:
 7517 -7518 -7519  0
c  -3 does not represent an automaton state.
c    -( b^{3, 376}_2 ∧  b^{3, 376}_1 ∧  b^{3, 376}_0 ∧ true) 
c  in CNF:
c    -b^{3, 376}_2 ∨ -b^{3, 376}_1 ∨ -b^{3, 376}_0 ∨ false 
c  in DIMACS:
-7517 -7518 -7519  0

c i = 377
c  -2+1 --> -1
c    ( b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧  p_1131) -> ( b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0)
c  in CNF:
c    -b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨  b^{3, 378}_2
c    -b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_1
c    -b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨  b^{3, 378}_0
c  in DIMACS:
-7520 -7521  7522 -1131  7523 0
-7520 -7521  7522 -1131 -7524 0
-7520 -7521  7522 -1131  7525 0

c  -1+1 --> 0
c    ( b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0 ∧  p_1131) -> (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧ -b^{3, 378}_0)
c  in CNF:
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_2
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_1
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_0
c  in DIMACS:
-7520  7521 -7522 -1131 -7523 0
-7520  7521 -7522 -1131 -7524 0
-7520  7521 -7522 -1131 -7525 0

c  0+1 --> 1
c    (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧  p_1131) -> (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0)
c  in CNF:
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_2
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_1
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨  b^{3, 378}_0
c  in DIMACS:
 7520  7521  7522 -1131 -7523 0
 7520  7521  7522 -1131 -7524 0
 7520  7521  7522 -1131  7525 0

c  1+1 --> 2
c    (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0 ∧  p_1131) -> (-b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0)
c  in CNF:
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_2
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨  b^{3, 378}_1
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ -p_1131 ∨ -b^{3, 378}_0
c  in DIMACS:
 7520  7521 -7522 -1131 -7523 0
 7520  7521 -7522 -1131  7524 0
 7520  7521 -7522 -1131 -7525 0

c  2+1 --> break 
c    (-b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 7520 -7521  7522 -1131 1162 0


c  2-1 --> 1
c    (-b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧ -p_1131) -> (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0)
c  in CNF:
c     b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_2
c     b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_1
c     b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨  b^{3, 378}_0
c  in DIMACS:
 7520 -7521  7522  1131 -7523 0
 7520 -7521  7522  1131 -7524 0
 7520 -7521  7522  1131  7525 0

c  1-1 --> 0
c    (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0 ∧ -p_1131) -> (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧ -b^{3, 378}_0)
c  in CNF:
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_2
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_1
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_0
c  in DIMACS:
 7520  7521 -7522  1131 -7523 0
 7520  7521 -7522  1131 -7524 0
 7520  7521 -7522  1131 -7525 0

c  0-1 --> -1
c    (-b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧ -p_1131) -> ( b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0)
c  in CNF:
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨  b^{3, 378}_2
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_1
c     b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨  b^{3, 378}_0
c  in DIMACS:
 7520  7521  7522  1131  7523 0
 7520  7521  7522  1131 -7524 0
 7520  7521  7522  1131  7525 0

c  -1-1 --> -2
c    ( b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧  b^{3, 377}_0 ∧ -p_1131) -> ( b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0)
c  in CNF:
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨  b^{3, 378}_2
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨  b^{3, 378}_1
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨  p_1131 ∨ -b^{3, 378}_0
c  in DIMACS:
-7520  7521 -7522  1131  7523 0
-7520  7521 -7522  1131  7524 0
-7520  7521 -7522  1131 -7525 0

c  -2-1 --> break 
c    ( b^{3, 377}_2 ∧  b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨  b^{3, 377}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-7520 -7521  7522  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 377}_2 ∧ -b^{3, 377}_1 ∧ -b^{3, 377}_0 ∧ true) 
c  in CNF:
c    -b^{3, 377}_2 ∨  b^{3, 377}_1 ∨  b^{3, 377}_0 ∨ false 
c  in DIMACS:
-7520  7521  7522  0

c  3 does not represent an automaton state.
c    -(-b^{3, 377}_2 ∧  b^{3, 377}_1 ∧  b^{3, 377}_0 ∧ true) 
c  in CNF:
c     b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ false 
c  in DIMACS:
 7520 -7521 -7522  0
c  -3 does not represent an automaton state.
c    -( b^{3, 377}_2 ∧  b^{3, 377}_1 ∧  b^{3, 377}_0 ∧ true) 
c  in CNF:
c    -b^{3, 377}_2 ∨ -b^{3, 377}_1 ∨ -b^{3, 377}_0 ∨ false 
c  in DIMACS:
-7520 -7521 -7522  0

c i = 378
c  -2+1 --> -1
c    ( b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧  p_1134) -> ( b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0)
c  in CNF:
c    -b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨  b^{3, 379}_2
c    -b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_1
c    -b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨  b^{3, 379}_0
c  in DIMACS:
-7523 -7524  7525 -1134  7526 0
-7523 -7524  7525 -1134 -7527 0
-7523 -7524  7525 -1134  7528 0

c  -1+1 --> 0
c    ( b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0 ∧  p_1134) -> (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧ -b^{3, 379}_0)
c  in CNF:
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_2
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_1
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_0
c  in DIMACS:
-7523  7524 -7525 -1134 -7526 0
-7523  7524 -7525 -1134 -7527 0
-7523  7524 -7525 -1134 -7528 0

c  0+1 --> 1
c    (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧  p_1134) -> (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0)
c  in CNF:
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_2
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_1
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨  b^{3, 379}_0
c  in DIMACS:
 7523  7524  7525 -1134 -7526 0
 7523  7524  7525 -1134 -7527 0
 7523  7524  7525 -1134  7528 0

c  1+1 --> 2
c    (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0 ∧  p_1134) -> (-b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0)
c  in CNF:
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_2
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨  b^{3, 379}_1
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ -p_1134 ∨ -b^{3, 379}_0
c  in DIMACS:
 7523  7524 -7525 -1134 -7526 0
 7523  7524 -7525 -1134  7527 0
 7523  7524 -7525 -1134 -7528 0

c  2+1 --> break 
c    (-b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 7523 -7524  7525 -1134 1162 0


c  2-1 --> 1
c    (-b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧ -p_1134) -> (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0)
c  in CNF:
c     b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_2
c     b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_1
c     b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨  b^{3, 379}_0
c  in DIMACS:
 7523 -7524  7525  1134 -7526 0
 7523 -7524  7525  1134 -7527 0
 7523 -7524  7525  1134  7528 0

c  1-1 --> 0
c    (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0 ∧ -p_1134) -> (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧ -b^{3, 379}_0)
c  in CNF:
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_2
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_1
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_0
c  in DIMACS:
 7523  7524 -7525  1134 -7526 0
 7523  7524 -7525  1134 -7527 0
 7523  7524 -7525  1134 -7528 0

c  0-1 --> -1
c    (-b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧ -p_1134) -> ( b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0)
c  in CNF:
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨  b^{3, 379}_2
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_1
c     b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨  b^{3, 379}_0
c  in DIMACS:
 7523  7524  7525  1134  7526 0
 7523  7524  7525  1134 -7527 0
 7523  7524  7525  1134  7528 0

c  -1-1 --> -2
c    ( b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧  b^{3, 378}_0 ∧ -p_1134) -> ( b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0)
c  in CNF:
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨  b^{3, 379}_2
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨  b^{3, 379}_1
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨  p_1134 ∨ -b^{3, 379}_0
c  in DIMACS:
-7523  7524 -7525  1134  7526 0
-7523  7524 -7525  1134  7527 0
-7523  7524 -7525  1134 -7528 0

c  -2-1 --> break 
c    ( b^{3, 378}_2 ∧  b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨  b^{3, 378}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-7523 -7524  7525  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 378}_2 ∧ -b^{3, 378}_1 ∧ -b^{3, 378}_0 ∧ true) 
c  in CNF:
c    -b^{3, 378}_2 ∨  b^{3, 378}_1 ∨  b^{3, 378}_0 ∨ false 
c  in DIMACS:
-7523  7524  7525  0

c  3 does not represent an automaton state.
c    -(-b^{3, 378}_2 ∧  b^{3, 378}_1 ∧  b^{3, 378}_0 ∧ true) 
c  in CNF:
c     b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ false 
c  in DIMACS:
 7523 -7524 -7525  0
c  -3 does not represent an automaton state.
c    -( b^{3, 378}_2 ∧  b^{3, 378}_1 ∧  b^{3, 378}_0 ∧ true) 
c  in CNF:
c    -b^{3, 378}_2 ∨ -b^{3, 378}_1 ∨ -b^{3, 378}_0 ∨ false 
c  in DIMACS:
-7523 -7524 -7525  0

c i = 379
c  -2+1 --> -1
c    ( b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧  p_1137) -> ( b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0)
c  in CNF:
c    -b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨  b^{3, 380}_2
c    -b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_1
c    -b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨  b^{3, 380}_0
c  in DIMACS:
-7526 -7527  7528 -1137  7529 0
-7526 -7527  7528 -1137 -7530 0
-7526 -7527  7528 -1137  7531 0

c  -1+1 --> 0
c    ( b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0 ∧  p_1137) -> (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧ -b^{3, 380}_0)
c  in CNF:
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_2
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_1
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_0
c  in DIMACS:
-7526  7527 -7528 -1137 -7529 0
-7526  7527 -7528 -1137 -7530 0
-7526  7527 -7528 -1137 -7531 0

c  0+1 --> 1
c    (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧  p_1137) -> (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0)
c  in CNF:
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_2
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_1
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨  b^{3, 380}_0
c  in DIMACS:
 7526  7527  7528 -1137 -7529 0
 7526  7527  7528 -1137 -7530 0
 7526  7527  7528 -1137  7531 0

c  1+1 --> 2
c    (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0 ∧  p_1137) -> (-b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0)
c  in CNF:
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_2
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨  b^{3, 380}_1
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ -p_1137 ∨ -b^{3, 380}_0
c  in DIMACS:
 7526  7527 -7528 -1137 -7529 0
 7526  7527 -7528 -1137  7530 0
 7526  7527 -7528 -1137 -7531 0

c  2+1 --> break 
c    (-b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧  p_1137) -> break
c  in CNF:
c     b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ -p_1137 ∨ break
c  in DIMACS:
 7526 -7527  7528 -1137 1162 0


c  2-1 --> 1
c    (-b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧ -p_1137) -> (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0)
c  in CNF:
c     b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_2
c     b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_1
c     b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨  b^{3, 380}_0
c  in DIMACS:
 7526 -7527  7528  1137 -7529 0
 7526 -7527  7528  1137 -7530 0
 7526 -7527  7528  1137  7531 0

c  1-1 --> 0
c    (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0 ∧ -p_1137) -> (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧ -b^{3, 380}_0)
c  in CNF:
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_2
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_1
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_0
c  in DIMACS:
 7526  7527 -7528  1137 -7529 0
 7526  7527 -7528  1137 -7530 0
 7526  7527 -7528  1137 -7531 0

c  0-1 --> -1
c    (-b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧ -p_1137) -> ( b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0)
c  in CNF:
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨  b^{3, 380}_2
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_1
c     b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨  b^{3, 380}_0
c  in DIMACS:
 7526  7527  7528  1137  7529 0
 7526  7527  7528  1137 -7530 0
 7526  7527  7528  1137  7531 0

c  -1-1 --> -2
c    ( b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧  b^{3, 379}_0 ∧ -p_1137) -> ( b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0)
c  in CNF:
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨  b^{3, 380}_2
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨  b^{3, 380}_1
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨  p_1137 ∨ -b^{3, 380}_0
c  in DIMACS:
-7526  7527 -7528  1137  7529 0
-7526  7527 -7528  1137  7530 0
-7526  7527 -7528  1137 -7531 0

c  -2-1 --> break 
c    ( b^{3, 379}_2 ∧  b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧ -p_1137) -> break
c  in CNF:
c    -b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨  b^{3, 379}_0 ∨  p_1137 ∨ break
c  in DIMACS:
-7526 -7527  7528  1137 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 379}_2 ∧ -b^{3, 379}_1 ∧ -b^{3, 379}_0 ∧ true) 
c  in CNF:
c    -b^{3, 379}_2 ∨  b^{3, 379}_1 ∨  b^{3, 379}_0 ∨ false 
c  in DIMACS:
-7526  7527  7528  0

c  3 does not represent an automaton state.
c    -(-b^{3, 379}_2 ∧  b^{3, 379}_1 ∧  b^{3, 379}_0 ∧ true) 
c  in CNF:
c     b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ false 
c  in DIMACS:
 7526 -7527 -7528  0
c  -3 does not represent an automaton state.
c    -( b^{3, 379}_2 ∧  b^{3, 379}_1 ∧  b^{3, 379}_0 ∧ true) 
c  in CNF:
c    -b^{3, 379}_2 ∨ -b^{3, 379}_1 ∨ -b^{3, 379}_0 ∨ false 
c  in DIMACS:
-7526 -7527 -7528  0

c i = 380
c  -2+1 --> -1
c    ( b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧  p_1140) -> ( b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0)
c  in CNF:
c    -b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨  b^{3, 381}_2
c    -b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_1
c    -b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨  b^{3, 381}_0
c  in DIMACS:
-7529 -7530  7531 -1140  7532 0
-7529 -7530  7531 -1140 -7533 0
-7529 -7530  7531 -1140  7534 0

c  -1+1 --> 0
c    ( b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0 ∧  p_1140) -> (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧ -b^{3, 381}_0)
c  in CNF:
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_2
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_1
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_0
c  in DIMACS:
-7529  7530 -7531 -1140 -7532 0
-7529  7530 -7531 -1140 -7533 0
-7529  7530 -7531 -1140 -7534 0

c  0+1 --> 1
c    (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧  p_1140) -> (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0)
c  in CNF:
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_2
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_1
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨  b^{3, 381}_0
c  in DIMACS:
 7529  7530  7531 -1140 -7532 0
 7529  7530  7531 -1140 -7533 0
 7529  7530  7531 -1140  7534 0

c  1+1 --> 2
c    (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0 ∧  p_1140) -> (-b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0)
c  in CNF:
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_2
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨  b^{3, 381}_1
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ -p_1140 ∨ -b^{3, 381}_0
c  in DIMACS:
 7529  7530 -7531 -1140 -7532 0
 7529  7530 -7531 -1140  7533 0
 7529  7530 -7531 -1140 -7534 0

c  2+1 --> break 
c    (-b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 7529 -7530  7531 -1140 1162 0


c  2-1 --> 1
c    (-b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧ -p_1140) -> (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0)
c  in CNF:
c     b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_2
c     b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_1
c     b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨  b^{3, 381}_0
c  in DIMACS:
 7529 -7530  7531  1140 -7532 0
 7529 -7530  7531  1140 -7533 0
 7529 -7530  7531  1140  7534 0

c  1-1 --> 0
c    (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0 ∧ -p_1140) -> (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧ -b^{3, 381}_0)
c  in CNF:
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_2
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_1
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_0
c  in DIMACS:
 7529  7530 -7531  1140 -7532 0
 7529  7530 -7531  1140 -7533 0
 7529  7530 -7531  1140 -7534 0

c  0-1 --> -1
c    (-b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧ -p_1140) -> ( b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0)
c  in CNF:
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨  b^{3, 381}_2
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_1
c     b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨  b^{3, 381}_0
c  in DIMACS:
 7529  7530  7531  1140  7532 0
 7529  7530  7531  1140 -7533 0
 7529  7530  7531  1140  7534 0

c  -1-1 --> -2
c    ( b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧  b^{3, 380}_0 ∧ -p_1140) -> ( b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0)
c  in CNF:
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨  b^{3, 381}_2
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨  b^{3, 381}_1
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨  p_1140 ∨ -b^{3, 381}_0
c  in DIMACS:
-7529  7530 -7531  1140  7532 0
-7529  7530 -7531  1140  7533 0
-7529  7530 -7531  1140 -7534 0

c  -2-1 --> break 
c    ( b^{3, 380}_2 ∧  b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨  b^{3, 380}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-7529 -7530  7531  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 380}_2 ∧ -b^{3, 380}_1 ∧ -b^{3, 380}_0 ∧ true) 
c  in CNF:
c    -b^{3, 380}_2 ∨  b^{3, 380}_1 ∨  b^{3, 380}_0 ∨ false 
c  in DIMACS:
-7529  7530  7531  0

c  3 does not represent an automaton state.
c    -(-b^{3, 380}_2 ∧  b^{3, 380}_1 ∧  b^{3, 380}_0 ∧ true) 
c  in CNF:
c     b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ false 
c  in DIMACS:
 7529 -7530 -7531  0
c  -3 does not represent an automaton state.
c    -( b^{3, 380}_2 ∧  b^{3, 380}_1 ∧  b^{3, 380}_0 ∧ true) 
c  in CNF:
c    -b^{3, 380}_2 ∨ -b^{3, 380}_1 ∨ -b^{3, 380}_0 ∨ false 
c  in DIMACS:
-7529 -7530 -7531  0

c i = 381
c  -2+1 --> -1
c    ( b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧  p_1143) -> ( b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0)
c  in CNF:
c    -b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨  b^{3, 382}_2
c    -b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_1
c    -b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨  b^{3, 382}_0
c  in DIMACS:
-7532 -7533  7534 -1143  7535 0
-7532 -7533  7534 -1143 -7536 0
-7532 -7533  7534 -1143  7537 0

c  -1+1 --> 0
c    ( b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0 ∧  p_1143) -> (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧ -b^{3, 382}_0)
c  in CNF:
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_2
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_1
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_0
c  in DIMACS:
-7532  7533 -7534 -1143 -7535 0
-7532  7533 -7534 -1143 -7536 0
-7532  7533 -7534 -1143 -7537 0

c  0+1 --> 1
c    (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧  p_1143) -> (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0)
c  in CNF:
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_2
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_1
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨  b^{3, 382}_0
c  in DIMACS:
 7532  7533  7534 -1143 -7535 0
 7532  7533  7534 -1143 -7536 0
 7532  7533  7534 -1143  7537 0

c  1+1 --> 2
c    (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0 ∧  p_1143) -> (-b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0)
c  in CNF:
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_2
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨  b^{3, 382}_1
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ -p_1143 ∨ -b^{3, 382}_0
c  in DIMACS:
 7532  7533 -7534 -1143 -7535 0
 7532  7533 -7534 -1143  7536 0
 7532  7533 -7534 -1143 -7537 0

c  2+1 --> break 
c    (-b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧  p_1143) -> break
c  in CNF:
c     b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ -p_1143 ∨ break
c  in DIMACS:
 7532 -7533  7534 -1143 1162 0


c  2-1 --> 1
c    (-b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧ -p_1143) -> (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0)
c  in CNF:
c     b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_2
c     b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_1
c     b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨  b^{3, 382}_0
c  in DIMACS:
 7532 -7533  7534  1143 -7535 0
 7532 -7533  7534  1143 -7536 0
 7532 -7533  7534  1143  7537 0

c  1-1 --> 0
c    (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0 ∧ -p_1143) -> (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧ -b^{3, 382}_0)
c  in CNF:
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_2
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_1
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_0
c  in DIMACS:
 7532  7533 -7534  1143 -7535 0
 7532  7533 -7534  1143 -7536 0
 7532  7533 -7534  1143 -7537 0

c  0-1 --> -1
c    (-b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧ -p_1143) -> ( b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0)
c  in CNF:
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨  b^{3, 382}_2
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_1
c     b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨  b^{3, 382}_0
c  in DIMACS:
 7532  7533  7534  1143  7535 0
 7532  7533  7534  1143 -7536 0
 7532  7533  7534  1143  7537 0

c  -1-1 --> -2
c    ( b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧  b^{3, 381}_0 ∧ -p_1143) -> ( b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0)
c  in CNF:
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨  b^{3, 382}_2
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨  b^{3, 382}_1
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨  p_1143 ∨ -b^{3, 382}_0
c  in DIMACS:
-7532  7533 -7534  1143  7535 0
-7532  7533 -7534  1143  7536 0
-7532  7533 -7534  1143 -7537 0

c  -2-1 --> break 
c    ( b^{3, 381}_2 ∧  b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧ -p_1143) -> break
c  in CNF:
c    -b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨  b^{3, 381}_0 ∨  p_1143 ∨ break
c  in DIMACS:
-7532 -7533  7534  1143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 381}_2 ∧ -b^{3, 381}_1 ∧ -b^{3, 381}_0 ∧ true) 
c  in CNF:
c    -b^{3, 381}_2 ∨  b^{3, 381}_1 ∨  b^{3, 381}_0 ∨ false 
c  in DIMACS:
-7532  7533  7534  0

c  3 does not represent an automaton state.
c    -(-b^{3, 381}_2 ∧  b^{3, 381}_1 ∧  b^{3, 381}_0 ∧ true) 
c  in CNF:
c     b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ false 
c  in DIMACS:
 7532 -7533 -7534  0
c  -3 does not represent an automaton state.
c    -( b^{3, 381}_2 ∧  b^{3, 381}_1 ∧  b^{3, 381}_0 ∧ true) 
c  in CNF:
c    -b^{3, 381}_2 ∨ -b^{3, 381}_1 ∨ -b^{3, 381}_0 ∨ false 
c  in DIMACS:
-7532 -7533 -7534  0

c i = 382
c  -2+1 --> -1
c    ( b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧  p_1146) -> ( b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0)
c  in CNF:
c    -b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨  b^{3, 383}_2
c    -b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_1
c    -b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨  b^{3, 383}_0
c  in DIMACS:
-7535 -7536  7537 -1146  7538 0
-7535 -7536  7537 -1146 -7539 0
-7535 -7536  7537 -1146  7540 0

c  -1+1 --> 0
c    ( b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0 ∧  p_1146) -> (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧ -b^{3, 383}_0)
c  in CNF:
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_2
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_1
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_0
c  in DIMACS:
-7535  7536 -7537 -1146 -7538 0
-7535  7536 -7537 -1146 -7539 0
-7535  7536 -7537 -1146 -7540 0

c  0+1 --> 1
c    (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧  p_1146) -> (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0)
c  in CNF:
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_2
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_1
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨  b^{3, 383}_0
c  in DIMACS:
 7535  7536  7537 -1146 -7538 0
 7535  7536  7537 -1146 -7539 0
 7535  7536  7537 -1146  7540 0

c  1+1 --> 2
c    (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0 ∧  p_1146) -> (-b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0)
c  in CNF:
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_2
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨  b^{3, 383}_1
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ -p_1146 ∨ -b^{3, 383}_0
c  in DIMACS:
 7535  7536 -7537 -1146 -7538 0
 7535  7536 -7537 -1146  7539 0
 7535  7536 -7537 -1146 -7540 0

c  2+1 --> break 
c    (-b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 7535 -7536  7537 -1146 1162 0


c  2-1 --> 1
c    (-b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧ -p_1146) -> (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0)
c  in CNF:
c     b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_2
c     b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_1
c     b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨  b^{3, 383}_0
c  in DIMACS:
 7535 -7536  7537  1146 -7538 0
 7535 -7536  7537  1146 -7539 0
 7535 -7536  7537  1146  7540 0

c  1-1 --> 0
c    (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0 ∧ -p_1146) -> (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧ -b^{3, 383}_0)
c  in CNF:
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_2
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_1
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_0
c  in DIMACS:
 7535  7536 -7537  1146 -7538 0
 7535  7536 -7537  1146 -7539 0
 7535  7536 -7537  1146 -7540 0

c  0-1 --> -1
c    (-b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧ -p_1146) -> ( b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0)
c  in CNF:
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨  b^{3, 383}_2
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_1
c     b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨  b^{3, 383}_0
c  in DIMACS:
 7535  7536  7537  1146  7538 0
 7535  7536  7537  1146 -7539 0
 7535  7536  7537  1146  7540 0

c  -1-1 --> -2
c    ( b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧  b^{3, 382}_0 ∧ -p_1146) -> ( b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0)
c  in CNF:
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨  b^{3, 383}_2
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨  b^{3, 383}_1
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨  p_1146 ∨ -b^{3, 383}_0
c  in DIMACS:
-7535  7536 -7537  1146  7538 0
-7535  7536 -7537  1146  7539 0
-7535  7536 -7537  1146 -7540 0

c  -2-1 --> break 
c    ( b^{3, 382}_2 ∧  b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨  b^{3, 382}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-7535 -7536  7537  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 382}_2 ∧ -b^{3, 382}_1 ∧ -b^{3, 382}_0 ∧ true) 
c  in CNF:
c    -b^{3, 382}_2 ∨  b^{3, 382}_1 ∨  b^{3, 382}_0 ∨ false 
c  in DIMACS:
-7535  7536  7537  0

c  3 does not represent an automaton state.
c    -(-b^{3, 382}_2 ∧  b^{3, 382}_1 ∧  b^{3, 382}_0 ∧ true) 
c  in CNF:
c     b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ false 
c  in DIMACS:
 7535 -7536 -7537  0
c  -3 does not represent an automaton state.
c    -( b^{3, 382}_2 ∧  b^{3, 382}_1 ∧  b^{3, 382}_0 ∧ true) 
c  in CNF:
c    -b^{3, 382}_2 ∨ -b^{3, 382}_1 ∨ -b^{3, 382}_0 ∨ false 
c  in DIMACS:
-7535 -7536 -7537  0

c i = 383
c  -2+1 --> -1
c    ( b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧  p_1149) -> ( b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0)
c  in CNF:
c    -b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨  b^{3, 384}_2
c    -b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_1
c    -b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨  b^{3, 384}_0
c  in DIMACS:
-7538 -7539  7540 -1149  7541 0
-7538 -7539  7540 -1149 -7542 0
-7538 -7539  7540 -1149  7543 0

c  -1+1 --> 0
c    ( b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0 ∧  p_1149) -> (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧ -b^{3, 384}_0)
c  in CNF:
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_2
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_1
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_0
c  in DIMACS:
-7538  7539 -7540 -1149 -7541 0
-7538  7539 -7540 -1149 -7542 0
-7538  7539 -7540 -1149 -7543 0

c  0+1 --> 1
c    (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧  p_1149) -> (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0)
c  in CNF:
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_2
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_1
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨  b^{3, 384}_0
c  in DIMACS:
 7538  7539  7540 -1149 -7541 0
 7538  7539  7540 -1149 -7542 0
 7538  7539  7540 -1149  7543 0

c  1+1 --> 2
c    (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0 ∧  p_1149) -> (-b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0)
c  in CNF:
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_2
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨  b^{3, 384}_1
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ -p_1149 ∨ -b^{3, 384}_0
c  in DIMACS:
 7538  7539 -7540 -1149 -7541 0
 7538  7539 -7540 -1149  7542 0
 7538  7539 -7540 -1149 -7543 0

c  2+1 --> break 
c    (-b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧  p_1149) -> break
c  in CNF:
c     b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ -p_1149 ∨ break
c  in DIMACS:
 7538 -7539  7540 -1149 1162 0


c  2-1 --> 1
c    (-b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧ -p_1149) -> (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0)
c  in CNF:
c     b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_2
c     b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_1
c     b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨  b^{3, 384}_0
c  in DIMACS:
 7538 -7539  7540  1149 -7541 0
 7538 -7539  7540  1149 -7542 0
 7538 -7539  7540  1149  7543 0

c  1-1 --> 0
c    (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0 ∧ -p_1149) -> (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧ -b^{3, 384}_0)
c  in CNF:
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_2
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_1
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_0
c  in DIMACS:
 7538  7539 -7540  1149 -7541 0
 7538  7539 -7540  1149 -7542 0
 7538  7539 -7540  1149 -7543 0

c  0-1 --> -1
c    (-b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧ -p_1149) -> ( b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0)
c  in CNF:
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨  b^{3, 384}_2
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_1
c     b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨  b^{3, 384}_0
c  in DIMACS:
 7538  7539  7540  1149  7541 0
 7538  7539  7540  1149 -7542 0
 7538  7539  7540  1149  7543 0

c  -1-1 --> -2
c    ( b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧  b^{3, 383}_0 ∧ -p_1149) -> ( b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0)
c  in CNF:
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨  b^{3, 384}_2
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨  b^{3, 384}_1
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨  p_1149 ∨ -b^{3, 384}_0
c  in DIMACS:
-7538  7539 -7540  1149  7541 0
-7538  7539 -7540  1149  7542 0
-7538  7539 -7540  1149 -7543 0

c  -2-1 --> break 
c    ( b^{3, 383}_2 ∧  b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧ -p_1149) -> break
c  in CNF:
c    -b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨  b^{3, 383}_0 ∨  p_1149 ∨ break
c  in DIMACS:
-7538 -7539  7540  1149 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 383}_2 ∧ -b^{3, 383}_1 ∧ -b^{3, 383}_0 ∧ true) 
c  in CNF:
c    -b^{3, 383}_2 ∨  b^{3, 383}_1 ∨  b^{3, 383}_0 ∨ false 
c  in DIMACS:
-7538  7539  7540  0

c  3 does not represent an automaton state.
c    -(-b^{3, 383}_2 ∧  b^{3, 383}_1 ∧  b^{3, 383}_0 ∧ true) 
c  in CNF:
c     b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ false 
c  in DIMACS:
 7538 -7539 -7540  0
c  -3 does not represent an automaton state.
c    -( b^{3, 383}_2 ∧  b^{3, 383}_1 ∧  b^{3, 383}_0 ∧ true) 
c  in CNF:
c    -b^{3, 383}_2 ∨ -b^{3, 383}_1 ∨ -b^{3, 383}_0 ∨ false 
c  in DIMACS:
-7538 -7539 -7540  0

c i = 384
c  -2+1 --> -1
c    ( b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧  p_1152) -> ( b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0)
c  in CNF:
c    -b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨  b^{3, 385}_2
c    -b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_1
c    -b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨  b^{3, 385}_0
c  in DIMACS:
-7541 -7542  7543 -1152  7544 0
-7541 -7542  7543 -1152 -7545 0
-7541 -7542  7543 -1152  7546 0

c  -1+1 --> 0
c    ( b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0 ∧  p_1152) -> (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧ -b^{3, 385}_0)
c  in CNF:
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_2
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_1
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_0
c  in DIMACS:
-7541  7542 -7543 -1152 -7544 0
-7541  7542 -7543 -1152 -7545 0
-7541  7542 -7543 -1152 -7546 0

c  0+1 --> 1
c    (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧  p_1152) -> (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0)
c  in CNF:
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_2
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_1
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨  b^{3, 385}_0
c  in DIMACS:
 7541  7542  7543 -1152 -7544 0
 7541  7542  7543 -1152 -7545 0
 7541  7542  7543 -1152  7546 0

c  1+1 --> 2
c    (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0 ∧  p_1152) -> (-b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0)
c  in CNF:
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_2
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨  b^{3, 385}_1
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ -p_1152 ∨ -b^{3, 385}_0
c  in DIMACS:
 7541  7542 -7543 -1152 -7544 0
 7541  7542 -7543 -1152  7545 0
 7541  7542 -7543 -1152 -7546 0

c  2+1 --> break 
c    (-b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 7541 -7542  7543 -1152 1162 0


c  2-1 --> 1
c    (-b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧ -p_1152) -> (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0)
c  in CNF:
c     b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_2
c     b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_1
c     b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨  b^{3, 385}_0
c  in DIMACS:
 7541 -7542  7543  1152 -7544 0
 7541 -7542  7543  1152 -7545 0
 7541 -7542  7543  1152  7546 0

c  1-1 --> 0
c    (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0 ∧ -p_1152) -> (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧ -b^{3, 385}_0)
c  in CNF:
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_2
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_1
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_0
c  in DIMACS:
 7541  7542 -7543  1152 -7544 0
 7541  7542 -7543  1152 -7545 0
 7541  7542 -7543  1152 -7546 0

c  0-1 --> -1
c    (-b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧ -p_1152) -> ( b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0)
c  in CNF:
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨  b^{3, 385}_2
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_1
c     b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨  b^{3, 385}_0
c  in DIMACS:
 7541  7542  7543  1152  7544 0
 7541  7542  7543  1152 -7545 0
 7541  7542  7543  1152  7546 0

c  -1-1 --> -2
c    ( b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧  b^{3, 384}_0 ∧ -p_1152) -> ( b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0)
c  in CNF:
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨  b^{3, 385}_2
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨  b^{3, 385}_1
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨  p_1152 ∨ -b^{3, 385}_0
c  in DIMACS:
-7541  7542 -7543  1152  7544 0
-7541  7542 -7543  1152  7545 0
-7541  7542 -7543  1152 -7546 0

c  -2-1 --> break 
c    ( b^{3, 384}_2 ∧  b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨  b^{3, 384}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-7541 -7542  7543  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 384}_2 ∧ -b^{3, 384}_1 ∧ -b^{3, 384}_0 ∧ true) 
c  in CNF:
c    -b^{3, 384}_2 ∨  b^{3, 384}_1 ∨  b^{3, 384}_0 ∨ false 
c  in DIMACS:
-7541  7542  7543  0

c  3 does not represent an automaton state.
c    -(-b^{3, 384}_2 ∧  b^{3, 384}_1 ∧  b^{3, 384}_0 ∧ true) 
c  in CNF:
c     b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ false 
c  in DIMACS:
 7541 -7542 -7543  0
c  -3 does not represent an automaton state.
c    -( b^{3, 384}_2 ∧  b^{3, 384}_1 ∧  b^{3, 384}_0 ∧ true) 
c  in CNF:
c    -b^{3, 384}_2 ∨ -b^{3, 384}_1 ∨ -b^{3, 384}_0 ∨ false 
c  in DIMACS:
-7541 -7542 -7543  0

c i = 385
c  -2+1 --> -1
c    ( b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧  p_1155) -> ( b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0)
c  in CNF:
c    -b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨  b^{3, 386}_2
c    -b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_1
c    -b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨  b^{3, 386}_0
c  in DIMACS:
-7544 -7545  7546 -1155  7547 0
-7544 -7545  7546 -1155 -7548 0
-7544 -7545  7546 -1155  7549 0

c  -1+1 --> 0
c    ( b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0 ∧  p_1155) -> (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧ -b^{3, 386}_0)
c  in CNF:
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_2
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_1
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_0
c  in DIMACS:
-7544  7545 -7546 -1155 -7547 0
-7544  7545 -7546 -1155 -7548 0
-7544  7545 -7546 -1155 -7549 0

c  0+1 --> 1
c    (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧  p_1155) -> (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0)
c  in CNF:
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_2
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_1
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨  b^{3, 386}_0
c  in DIMACS:
 7544  7545  7546 -1155 -7547 0
 7544  7545  7546 -1155 -7548 0
 7544  7545  7546 -1155  7549 0

c  1+1 --> 2
c    (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0 ∧  p_1155) -> (-b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0)
c  in CNF:
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_2
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨  b^{3, 386}_1
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ -p_1155 ∨ -b^{3, 386}_0
c  in DIMACS:
 7544  7545 -7546 -1155 -7547 0
 7544  7545 -7546 -1155  7548 0
 7544  7545 -7546 -1155 -7549 0

c  2+1 --> break 
c    (-b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 7544 -7545  7546 -1155 1162 0


c  2-1 --> 1
c    (-b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧ -p_1155) -> (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0)
c  in CNF:
c     b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_2
c     b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_1
c     b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨  b^{3, 386}_0
c  in DIMACS:
 7544 -7545  7546  1155 -7547 0
 7544 -7545  7546  1155 -7548 0
 7544 -7545  7546  1155  7549 0

c  1-1 --> 0
c    (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0 ∧ -p_1155) -> (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧ -b^{3, 386}_0)
c  in CNF:
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_2
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_1
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_0
c  in DIMACS:
 7544  7545 -7546  1155 -7547 0
 7544  7545 -7546  1155 -7548 0
 7544  7545 -7546  1155 -7549 0

c  0-1 --> -1
c    (-b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧ -p_1155) -> ( b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0)
c  in CNF:
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨  b^{3, 386}_2
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_1
c     b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨  b^{3, 386}_0
c  in DIMACS:
 7544  7545  7546  1155  7547 0
 7544  7545  7546  1155 -7548 0
 7544  7545  7546  1155  7549 0

c  -1-1 --> -2
c    ( b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧  b^{3, 385}_0 ∧ -p_1155) -> ( b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0)
c  in CNF:
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨  b^{3, 386}_2
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨  b^{3, 386}_1
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨  p_1155 ∨ -b^{3, 386}_0
c  in DIMACS:
-7544  7545 -7546  1155  7547 0
-7544  7545 -7546  1155  7548 0
-7544  7545 -7546  1155 -7549 0

c  -2-1 --> break 
c    ( b^{3, 385}_2 ∧  b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨  b^{3, 385}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-7544 -7545  7546  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 385}_2 ∧ -b^{3, 385}_1 ∧ -b^{3, 385}_0 ∧ true) 
c  in CNF:
c    -b^{3, 385}_2 ∨  b^{3, 385}_1 ∨  b^{3, 385}_0 ∨ false 
c  in DIMACS:
-7544  7545  7546  0

c  3 does not represent an automaton state.
c    -(-b^{3, 385}_2 ∧  b^{3, 385}_1 ∧  b^{3, 385}_0 ∧ true) 
c  in CNF:
c     b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ false 
c  in DIMACS:
 7544 -7545 -7546  0
c  -3 does not represent an automaton state.
c    -( b^{3, 385}_2 ∧  b^{3, 385}_1 ∧  b^{3, 385}_0 ∧ true) 
c  in CNF:
c    -b^{3, 385}_2 ∨ -b^{3, 385}_1 ∨ -b^{3, 385}_0 ∨ false 
c  in DIMACS:
-7544 -7545 -7546  0

c i = 386
c  -2+1 --> -1
c    ( b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧  p_1158) -> ( b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0)
c  in CNF:
c    -b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨  b^{3, 387}_2
c    -b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_1
c    -b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨  b^{3, 387}_0
c  in DIMACS:
-7547 -7548  7549 -1158  7550 0
-7547 -7548  7549 -1158 -7551 0
-7547 -7548  7549 -1158  7552 0

c  -1+1 --> 0
c    ( b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0 ∧  p_1158) -> (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧ -b^{3, 387}_0)
c  in CNF:
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_2
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_1
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_0
c  in DIMACS:
-7547  7548 -7549 -1158 -7550 0
-7547  7548 -7549 -1158 -7551 0
-7547  7548 -7549 -1158 -7552 0

c  0+1 --> 1
c    (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧  p_1158) -> (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0)
c  in CNF:
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_2
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_1
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨  b^{3, 387}_0
c  in DIMACS:
 7547  7548  7549 -1158 -7550 0
 7547  7548  7549 -1158 -7551 0
 7547  7548  7549 -1158  7552 0

c  1+1 --> 2
c    (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0 ∧  p_1158) -> (-b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0)
c  in CNF:
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_2
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨  b^{3, 387}_1
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ -p_1158 ∨ -b^{3, 387}_0
c  in DIMACS:
 7547  7548 -7549 -1158 -7550 0
 7547  7548 -7549 -1158  7551 0
 7547  7548 -7549 -1158 -7552 0

c  2+1 --> break 
c    (-b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 7547 -7548  7549 -1158 1162 0


c  2-1 --> 1
c    (-b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧ -p_1158) -> (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0)
c  in CNF:
c     b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_2
c     b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_1
c     b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨  b^{3, 387}_0
c  in DIMACS:
 7547 -7548  7549  1158 -7550 0
 7547 -7548  7549  1158 -7551 0
 7547 -7548  7549  1158  7552 0

c  1-1 --> 0
c    (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0 ∧ -p_1158) -> (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧ -b^{3, 387}_0)
c  in CNF:
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_2
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_1
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_0
c  in DIMACS:
 7547  7548 -7549  1158 -7550 0
 7547  7548 -7549  1158 -7551 0
 7547  7548 -7549  1158 -7552 0

c  0-1 --> -1
c    (-b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧ -p_1158) -> ( b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0)
c  in CNF:
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨  b^{3, 387}_2
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_1
c     b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨  b^{3, 387}_0
c  in DIMACS:
 7547  7548  7549  1158  7550 0
 7547  7548  7549  1158 -7551 0
 7547  7548  7549  1158  7552 0

c  -1-1 --> -2
c    ( b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧  b^{3, 386}_0 ∧ -p_1158) -> ( b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0)
c  in CNF:
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨  b^{3, 387}_2
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨  b^{3, 387}_1
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨  p_1158 ∨ -b^{3, 387}_0
c  in DIMACS:
-7547  7548 -7549  1158  7550 0
-7547  7548 -7549  1158  7551 0
-7547  7548 -7549  1158 -7552 0

c  -2-1 --> break 
c    ( b^{3, 386}_2 ∧  b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨  b^{3, 386}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-7547 -7548  7549  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 386}_2 ∧ -b^{3, 386}_1 ∧ -b^{3, 386}_0 ∧ true) 
c  in CNF:
c    -b^{3, 386}_2 ∨  b^{3, 386}_1 ∨  b^{3, 386}_0 ∨ false 
c  in DIMACS:
-7547  7548  7549  0

c  3 does not represent an automaton state.
c    -(-b^{3, 386}_2 ∧  b^{3, 386}_1 ∧  b^{3, 386}_0 ∧ true) 
c  in CNF:
c     b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ false 
c  in DIMACS:
 7547 -7548 -7549  0
c  -3 does not represent an automaton state.
c    -( b^{3, 386}_2 ∧  b^{3, 386}_1 ∧  b^{3, 386}_0 ∧ true) 
c  in CNF:
c    -b^{3, 386}_2 ∨ -b^{3, 386}_1 ∨ -b^{3, 386}_0 ∨ false 
c  in DIMACS:
-7547 -7548 -7549  0

c i = 387
c  -2+1 --> -1
c    ( b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧  p_1161) -> ( b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧  b^{3, 388}_0)
c  in CNF:
c    -b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨  b^{3, 388}_2
c    -b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_1
c    -b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨  b^{3, 388}_0
c  in DIMACS:
-7550 -7551  7552 -1161  7553 0
-7550 -7551  7552 -1161 -7554 0
-7550 -7551  7552 -1161  7555 0

c  -1+1 --> 0
c    ( b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0 ∧  p_1161) -> (-b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧ -b^{3, 388}_0)
c  in CNF:
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_2
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_1
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_0
c  in DIMACS:
-7550  7551 -7552 -1161 -7553 0
-7550  7551 -7552 -1161 -7554 0
-7550  7551 -7552 -1161 -7555 0

c  0+1 --> 1
c    (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧  p_1161) -> (-b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧  b^{3, 388}_0)
c  in CNF:
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_2
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_1
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨  b^{3, 388}_0
c  in DIMACS:
 7550  7551  7552 -1161 -7553 0
 7550  7551  7552 -1161 -7554 0
 7550  7551  7552 -1161  7555 0

c  1+1 --> 2
c    (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0 ∧  p_1161) -> (-b^{3, 388}_2 ∧  b^{3, 388}_1 ∧ -b^{3, 388}_0)
c  in CNF:
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_2
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨  b^{3, 388}_1
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ -p_1161 ∨ -b^{3, 388}_0
c  in DIMACS:
 7550  7551 -7552 -1161 -7553 0
 7550  7551 -7552 -1161  7554 0
 7550  7551 -7552 -1161 -7555 0

c  2+1 --> break 
c    (-b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 7550 -7551  7552 -1161 1162 0


c  2-1 --> 1
c    (-b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧ -p_1161) -> (-b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧  b^{3, 388}_0)
c  in CNF:
c     b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_2
c     b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_1
c     b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨  b^{3, 388}_0
c  in DIMACS:
 7550 -7551  7552  1161 -7553 0
 7550 -7551  7552  1161 -7554 0
 7550 -7551  7552  1161  7555 0

c  1-1 --> 0
c    (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0 ∧ -p_1161) -> (-b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧ -b^{3, 388}_0)
c  in CNF:
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_2
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_1
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_0
c  in DIMACS:
 7550  7551 -7552  1161 -7553 0
 7550  7551 -7552  1161 -7554 0
 7550  7551 -7552  1161 -7555 0

c  0-1 --> -1
c    (-b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧ -p_1161) -> ( b^{3, 388}_2 ∧ -b^{3, 388}_1 ∧  b^{3, 388}_0)
c  in CNF:
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨  b^{3, 388}_2
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_1
c     b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨  b^{3, 388}_0
c  in DIMACS:
 7550  7551  7552  1161  7553 0
 7550  7551  7552  1161 -7554 0
 7550  7551  7552  1161  7555 0

c  -1-1 --> -2
c    ( b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧  b^{3, 387}_0 ∧ -p_1161) -> ( b^{3, 388}_2 ∧  b^{3, 388}_1 ∧ -b^{3, 388}_0)
c  in CNF:
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨  b^{3, 388}_2
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨  b^{3, 388}_1
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨  p_1161 ∨ -b^{3, 388}_0
c  in DIMACS:
-7550  7551 -7552  1161  7553 0
-7550  7551 -7552  1161  7554 0
-7550  7551 -7552  1161 -7555 0

c  -2-1 --> break 
c    ( b^{3, 387}_2 ∧  b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨  b^{3, 387}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-7550 -7551  7552  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{3, 387}_2 ∧ -b^{3, 387}_1 ∧ -b^{3, 387}_0 ∧ true) 
c  in CNF:
c    -b^{3, 387}_2 ∨  b^{3, 387}_1 ∨  b^{3, 387}_0 ∨ false 
c  in DIMACS:
-7550  7551  7552  0

c  3 does not represent an automaton state.
c    -(-b^{3, 387}_2 ∧  b^{3, 387}_1 ∧  b^{3, 387}_0 ∧ true) 
c  in CNF:
c     b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ false 
c  in DIMACS:
 7550 -7551 -7552  0
c  -3 does not represent an automaton state.
c    -( b^{3, 387}_2 ∧  b^{3, 387}_1 ∧  b^{3, 387}_0 ∧ true) 
c  in CNF:
c    -b^{3, 387}_2 ∨ -b^{3, 387}_1 ∨ -b^{3, 387}_0 ∨ false 
c  in DIMACS:
-7550 -7551 -7552  0

c INIT for k = 4
c    -b^{4, 1}_2
c    -b^{4, 1}_1
c    -b^{4, 1}_0
c  in DIMACS:
-7556 0
-7557 0
-7558 0

c Transitions for k = 4
c i = 1
c  -2+1 --> -1
c    ( b^{4, 1}_2 ∧  b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧  p_4) -> ( b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0)
c  in CNF:
c    -b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨  b^{4, 2}_2
c    -b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_1
c    -b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨  b^{4, 2}_0
c  in DIMACS:
-7556 -7557  7558 -4  7559 0
-7556 -7557  7558 -4 -7560 0
-7556 -7557  7558 -4  7561 0

c  -1+1 --> 0
c    ( b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧  b^{4, 1}_0 ∧  p_4) -> (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧ -b^{4, 2}_0)
c  in CNF:
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_2
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_1
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_0
c  in DIMACS:
-7556  7557 -7558 -4 -7559 0
-7556  7557 -7558 -4 -7560 0
-7556  7557 -7558 -4 -7561 0

c  0+1 --> 1
c    (-b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧  p_4) -> (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0)
c  in CNF:
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_2
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_1
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨  b^{4, 2}_0
c  in DIMACS:
 7556  7557  7558 -4 -7559 0
 7556  7557  7558 -4 -7560 0
 7556  7557  7558 -4  7561 0

c  1+1 --> 2
c    (-b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧  b^{4, 1}_0 ∧  p_4) -> (-b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0)
c  in CNF:
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_2
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨  b^{4, 2}_1
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ -p_4 ∨ -b^{4, 2}_0
c  in DIMACS:
 7556  7557 -7558 -4 -7559 0
 7556  7557 -7558 -4  7560 0
 7556  7557 -7558 -4 -7561 0

c  2+1 --> break 
c    (-b^{4, 1}_2 ∧  b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧  p_4) -> break
c  in CNF:
c     b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ -p_4 ∨ break
c  in DIMACS:
 7556 -7557  7558 -4 1162 0


c  2-1 --> 1
c    (-b^{4, 1}_2 ∧  b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧ -p_4) -> (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0)
c  in CNF:
c     b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_2
c     b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_1
c     b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨  b^{4, 2}_0
c  in DIMACS:
 7556 -7557  7558  4 -7559 0
 7556 -7557  7558  4 -7560 0
 7556 -7557  7558  4  7561 0

c  1-1 --> 0
c    (-b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧  b^{4, 1}_0 ∧ -p_4) -> (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧ -b^{4, 2}_0)
c  in CNF:
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_2
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_1
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_0
c  in DIMACS:
 7556  7557 -7558  4 -7559 0
 7556  7557 -7558  4 -7560 0
 7556  7557 -7558  4 -7561 0

c  0-1 --> -1
c    (-b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧ -p_4) -> ( b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0)
c  in CNF:
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨  b^{4, 2}_2
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_1
c     b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨  b^{4, 2}_0
c  in DIMACS:
 7556  7557  7558  4  7559 0
 7556  7557  7558  4 -7560 0
 7556  7557  7558  4  7561 0

c  -1-1 --> -2
c    ( b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧  b^{4, 1}_0 ∧ -p_4) -> ( b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0)
c  in CNF:
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨  b^{4, 2}_2
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨  b^{4, 2}_1
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨  p_4 ∨ -b^{4, 2}_0
c  in DIMACS:
-7556  7557 -7558  4  7559 0
-7556  7557 -7558  4  7560 0
-7556  7557 -7558  4 -7561 0

c  -2-1 --> break 
c    ( b^{4, 1}_2 ∧  b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧ -p_4) -> break
c  in CNF:
c    -b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨  b^{4, 1}_0 ∨  p_4 ∨ break
c  in DIMACS:
-7556 -7557  7558  4 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 1}_2 ∧ -b^{4, 1}_1 ∧ -b^{4, 1}_0 ∧ true) 
c  in CNF:
c    -b^{4, 1}_2 ∨  b^{4, 1}_1 ∨  b^{4, 1}_0 ∨ false 
c  in DIMACS:
-7556  7557  7558  0

c  3 does not represent an automaton state.
c    -(-b^{4, 1}_2 ∧  b^{4, 1}_1 ∧  b^{4, 1}_0 ∧ true) 
c  in CNF:
c     b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ false 
c  in DIMACS:
 7556 -7557 -7558  0
c  -3 does not represent an automaton state.
c    -( b^{4, 1}_2 ∧  b^{4, 1}_1 ∧  b^{4, 1}_0 ∧ true) 
c  in CNF:
c    -b^{4, 1}_2 ∨ -b^{4, 1}_1 ∨ -b^{4, 1}_0 ∨ false 
c  in DIMACS:
-7556 -7557 -7558  0

c i = 2
c  -2+1 --> -1
c    ( b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧  p_8) -> ( b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0)
c  in CNF:
c    -b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨  b^{4, 3}_2
c    -b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_1
c    -b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨  b^{4, 3}_0
c  in DIMACS:
-7559 -7560  7561 -8  7562 0
-7559 -7560  7561 -8 -7563 0
-7559 -7560  7561 -8  7564 0

c  -1+1 --> 0
c    ( b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0 ∧  p_8) -> (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧ -b^{4, 3}_0)
c  in CNF:
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_2
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_1
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_0
c  in DIMACS:
-7559  7560 -7561 -8 -7562 0
-7559  7560 -7561 -8 -7563 0
-7559  7560 -7561 -8 -7564 0

c  0+1 --> 1
c    (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧  p_8) -> (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0)
c  in CNF:
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_2
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_1
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨  b^{4, 3}_0
c  in DIMACS:
 7559  7560  7561 -8 -7562 0
 7559  7560  7561 -8 -7563 0
 7559  7560  7561 -8  7564 0

c  1+1 --> 2
c    (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0 ∧  p_8) -> (-b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0)
c  in CNF:
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_2
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨  b^{4, 3}_1
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ -p_8 ∨ -b^{4, 3}_0
c  in DIMACS:
 7559  7560 -7561 -8 -7562 0
 7559  7560 -7561 -8  7563 0
 7559  7560 -7561 -8 -7564 0

c  2+1 --> break 
c    (-b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧  p_8) -> break
c  in CNF:
c     b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ -p_8 ∨ break
c  in DIMACS:
 7559 -7560  7561 -8 1162 0


c  2-1 --> 1
c    (-b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧ -p_8) -> (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0)
c  in CNF:
c     b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_2
c     b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_1
c     b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨  b^{4, 3}_0
c  in DIMACS:
 7559 -7560  7561  8 -7562 0
 7559 -7560  7561  8 -7563 0
 7559 -7560  7561  8  7564 0

c  1-1 --> 0
c    (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0 ∧ -p_8) -> (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧ -b^{4, 3}_0)
c  in CNF:
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_2
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_1
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_0
c  in DIMACS:
 7559  7560 -7561  8 -7562 0
 7559  7560 -7561  8 -7563 0
 7559  7560 -7561  8 -7564 0

c  0-1 --> -1
c    (-b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧ -p_8) -> ( b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0)
c  in CNF:
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨  b^{4, 3}_2
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_1
c     b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨  b^{4, 3}_0
c  in DIMACS:
 7559  7560  7561  8  7562 0
 7559  7560  7561  8 -7563 0
 7559  7560  7561  8  7564 0

c  -1-1 --> -2
c    ( b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧  b^{4, 2}_0 ∧ -p_8) -> ( b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0)
c  in CNF:
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨  b^{4, 3}_2
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨  b^{4, 3}_1
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨  p_8 ∨ -b^{4, 3}_0
c  in DIMACS:
-7559  7560 -7561  8  7562 0
-7559  7560 -7561  8  7563 0
-7559  7560 -7561  8 -7564 0

c  -2-1 --> break 
c    ( b^{4, 2}_2 ∧  b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧ -p_8) -> break
c  in CNF:
c    -b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨  b^{4, 2}_0 ∨  p_8 ∨ break
c  in DIMACS:
-7559 -7560  7561  8 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 2}_2 ∧ -b^{4, 2}_1 ∧ -b^{4, 2}_0 ∧ true) 
c  in CNF:
c    -b^{4, 2}_2 ∨  b^{4, 2}_1 ∨  b^{4, 2}_0 ∨ false 
c  in DIMACS:
-7559  7560  7561  0

c  3 does not represent an automaton state.
c    -(-b^{4, 2}_2 ∧  b^{4, 2}_1 ∧  b^{4, 2}_0 ∧ true) 
c  in CNF:
c     b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ false 
c  in DIMACS:
 7559 -7560 -7561  0
c  -3 does not represent an automaton state.
c    -( b^{4, 2}_2 ∧  b^{4, 2}_1 ∧  b^{4, 2}_0 ∧ true) 
c  in CNF:
c    -b^{4, 2}_2 ∨ -b^{4, 2}_1 ∨ -b^{4, 2}_0 ∨ false 
c  in DIMACS:
-7559 -7560 -7561  0

c i = 3
c  -2+1 --> -1
c    ( b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧  p_12) -> ( b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0)
c  in CNF:
c    -b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨  b^{4, 4}_2
c    -b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_1
c    -b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨  b^{4, 4}_0
c  in DIMACS:
-7562 -7563  7564 -12  7565 0
-7562 -7563  7564 -12 -7566 0
-7562 -7563  7564 -12  7567 0

c  -1+1 --> 0
c    ( b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0 ∧  p_12) -> (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧ -b^{4, 4}_0)
c  in CNF:
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_2
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_1
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_0
c  in DIMACS:
-7562  7563 -7564 -12 -7565 0
-7562  7563 -7564 -12 -7566 0
-7562  7563 -7564 -12 -7567 0

c  0+1 --> 1
c    (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧  p_12) -> (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0)
c  in CNF:
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_2
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_1
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨  b^{4, 4}_0
c  in DIMACS:
 7562  7563  7564 -12 -7565 0
 7562  7563  7564 -12 -7566 0
 7562  7563  7564 -12  7567 0

c  1+1 --> 2
c    (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0 ∧  p_12) -> (-b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0)
c  in CNF:
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_2
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨  b^{4, 4}_1
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ -p_12 ∨ -b^{4, 4}_0
c  in DIMACS:
 7562  7563 -7564 -12 -7565 0
 7562  7563 -7564 -12  7566 0
 7562  7563 -7564 -12 -7567 0

c  2+1 --> break 
c    (-b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧  p_12) -> break
c  in CNF:
c     b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 7562 -7563  7564 -12 1162 0


c  2-1 --> 1
c    (-b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧ -p_12) -> (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0)
c  in CNF:
c     b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_2
c     b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_1
c     b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨  b^{4, 4}_0
c  in DIMACS:
 7562 -7563  7564  12 -7565 0
 7562 -7563  7564  12 -7566 0
 7562 -7563  7564  12  7567 0

c  1-1 --> 0
c    (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0 ∧ -p_12) -> (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧ -b^{4, 4}_0)
c  in CNF:
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_2
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_1
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_0
c  in DIMACS:
 7562  7563 -7564  12 -7565 0
 7562  7563 -7564  12 -7566 0
 7562  7563 -7564  12 -7567 0

c  0-1 --> -1
c    (-b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧ -p_12) -> ( b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0)
c  in CNF:
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨  b^{4, 4}_2
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_1
c     b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨  b^{4, 4}_0
c  in DIMACS:
 7562  7563  7564  12  7565 0
 7562  7563  7564  12 -7566 0
 7562  7563  7564  12  7567 0

c  -1-1 --> -2
c    ( b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧  b^{4, 3}_0 ∧ -p_12) -> ( b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0)
c  in CNF:
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨  b^{4, 4}_2
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨  b^{4, 4}_1
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨  p_12 ∨ -b^{4, 4}_0
c  in DIMACS:
-7562  7563 -7564  12  7565 0
-7562  7563 -7564  12  7566 0
-7562  7563 -7564  12 -7567 0

c  -2-1 --> break 
c    ( b^{4, 3}_2 ∧  b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨  b^{4, 3}_0 ∨  p_12 ∨ break
c  in DIMACS:
-7562 -7563  7564  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 3}_2 ∧ -b^{4, 3}_1 ∧ -b^{4, 3}_0 ∧ true) 
c  in CNF:
c    -b^{4, 3}_2 ∨  b^{4, 3}_1 ∨  b^{4, 3}_0 ∨ false 
c  in DIMACS:
-7562  7563  7564  0

c  3 does not represent an automaton state.
c    -(-b^{4, 3}_2 ∧  b^{4, 3}_1 ∧  b^{4, 3}_0 ∧ true) 
c  in CNF:
c     b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ false 
c  in DIMACS:
 7562 -7563 -7564  0
c  -3 does not represent an automaton state.
c    -( b^{4, 3}_2 ∧  b^{4, 3}_1 ∧  b^{4, 3}_0 ∧ true) 
c  in CNF:
c    -b^{4, 3}_2 ∨ -b^{4, 3}_1 ∨ -b^{4, 3}_0 ∨ false 
c  in DIMACS:
-7562 -7563 -7564  0

c i = 4
c  -2+1 --> -1
c    ( b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧  p_16) -> ( b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0)
c  in CNF:
c    -b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨  b^{4, 5}_2
c    -b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_1
c    -b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨  b^{4, 5}_0
c  in DIMACS:
-7565 -7566  7567 -16  7568 0
-7565 -7566  7567 -16 -7569 0
-7565 -7566  7567 -16  7570 0

c  -1+1 --> 0
c    ( b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0 ∧  p_16) -> (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧ -b^{4, 5}_0)
c  in CNF:
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_2
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_1
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_0
c  in DIMACS:
-7565  7566 -7567 -16 -7568 0
-7565  7566 -7567 -16 -7569 0
-7565  7566 -7567 -16 -7570 0

c  0+1 --> 1
c    (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧  p_16) -> (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0)
c  in CNF:
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_2
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_1
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨  b^{4, 5}_0
c  in DIMACS:
 7565  7566  7567 -16 -7568 0
 7565  7566  7567 -16 -7569 0
 7565  7566  7567 -16  7570 0

c  1+1 --> 2
c    (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0 ∧  p_16) -> (-b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0)
c  in CNF:
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_2
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨  b^{4, 5}_1
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ -p_16 ∨ -b^{4, 5}_0
c  in DIMACS:
 7565  7566 -7567 -16 -7568 0
 7565  7566 -7567 -16  7569 0
 7565  7566 -7567 -16 -7570 0

c  2+1 --> break 
c    (-b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧  p_16) -> break
c  in CNF:
c     b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ -p_16 ∨ break
c  in DIMACS:
 7565 -7566  7567 -16 1162 0


c  2-1 --> 1
c    (-b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧ -p_16) -> (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0)
c  in CNF:
c     b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_2
c     b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_1
c     b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨  b^{4, 5}_0
c  in DIMACS:
 7565 -7566  7567  16 -7568 0
 7565 -7566  7567  16 -7569 0
 7565 -7566  7567  16  7570 0

c  1-1 --> 0
c    (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0 ∧ -p_16) -> (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧ -b^{4, 5}_0)
c  in CNF:
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_2
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_1
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_0
c  in DIMACS:
 7565  7566 -7567  16 -7568 0
 7565  7566 -7567  16 -7569 0
 7565  7566 -7567  16 -7570 0

c  0-1 --> -1
c    (-b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧ -p_16) -> ( b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0)
c  in CNF:
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨  b^{4, 5}_2
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_1
c     b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨  b^{4, 5}_0
c  in DIMACS:
 7565  7566  7567  16  7568 0
 7565  7566  7567  16 -7569 0
 7565  7566  7567  16  7570 0

c  -1-1 --> -2
c    ( b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧  b^{4, 4}_0 ∧ -p_16) -> ( b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0)
c  in CNF:
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨  b^{4, 5}_2
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨  b^{4, 5}_1
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨  p_16 ∨ -b^{4, 5}_0
c  in DIMACS:
-7565  7566 -7567  16  7568 0
-7565  7566 -7567  16  7569 0
-7565  7566 -7567  16 -7570 0

c  -2-1 --> break 
c    ( b^{4, 4}_2 ∧  b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧ -p_16) -> break
c  in CNF:
c    -b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨  b^{4, 4}_0 ∨  p_16 ∨ break
c  in DIMACS:
-7565 -7566  7567  16 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 4}_2 ∧ -b^{4, 4}_1 ∧ -b^{4, 4}_0 ∧ true) 
c  in CNF:
c    -b^{4, 4}_2 ∨  b^{4, 4}_1 ∨  b^{4, 4}_0 ∨ false 
c  in DIMACS:
-7565  7566  7567  0

c  3 does not represent an automaton state.
c    -(-b^{4, 4}_2 ∧  b^{4, 4}_1 ∧  b^{4, 4}_0 ∧ true) 
c  in CNF:
c     b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ false 
c  in DIMACS:
 7565 -7566 -7567  0
c  -3 does not represent an automaton state.
c    -( b^{4, 4}_2 ∧  b^{4, 4}_1 ∧  b^{4, 4}_0 ∧ true) 
c  in CNF:
c    -b^{4, 4}_2 ∨ -b^{4, 4}_1 ∨ -b^{4, 4}_0 ∨ false 
c  in DIMACS:
-7565 -7566 -7567  0

c i = 5
c  -2+1 --> -1
c    ( b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧  p_20) -> ( b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0)
c  in CNF:
c    -b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨  b^{4, 6}_2
c    -b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_1
c    -b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨  b^{4, 6}_0
c  in DIMACS:
-7568 -7569  7570 -20  7571 0
-7568 -7569  7570 -20 -7572 0
-7568 -7569  7570 -20  7573 0

c  -1+1 --> 0
c    ( b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0 ∧  p_20) -> (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧ -b^{4, 6}_0)
c  in CNF:
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_2
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_1
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_0
c  in DIMACS:
-7568  7569 -7570 -20 -7571 0
-7568  7569 -7570 -20 -7572 0
-7568  7569 -7570 -20 -7573 0

c  0+1 --> 1
c    (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧  p_20) -> (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0)
c  in CNF:
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_2
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_1
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨  b^{4, 6}_0
c  in DIMACS:
 7568  7569  7570 -20 -7571 0
 7568  7569  7570 -20 -7572 0
 7568  7569  7570 -20  7573 0

c  1+1 --> 2
c    (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0 ∧  p_20) -> (-b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0)
c  in CNF:
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_2
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨  b^{4, 6}_1
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ -p_20 ∨ -b^{4, 6}_0
c  in DIMACS:
 7568  7569 -7570 -20 -7571 0
 7568  7569 -7570 -20  7572 0
 7568  7569 -7570 -20 -7573 0

c  2+1 --> break 
c    (-b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧  p_20) -> break
c  in CNF:
c     b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 7568 -7569  7570 -20 1162 0


c  2-1 --> 1
c    (-b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧ -p_20) -> (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0)
c  in CNF:
c     b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_2
c     b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_1
c     b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨  b^{4, 6}_0
c  in DIMACS:
 7568 -7569  7570  20 -7571 0
 7568 -7569  7570  20 -7572 0
 7568 -7569  7570  20  7573 0

c  1-1 --> 0
c    (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0 ∧ -p_20) -> (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧ -b^{4, 6}_0)
c  in CNF:
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_2
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_1
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_0
c  in DIMACS:
 7568  7569 -7570  20 -7571 0
 7568  7569 -7570  20 -7572 0
 7568  7569 -7570  20 -7573 0

c  0-1 --> -1
c    (-b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧ -p_20) -> ( b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0)
c  in CNF:
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨  b^{4, 6}_2
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_1
c     b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨  b^{4, 6}_0
c  in DIMACS:
 7568  7569  7570  20  7571 0
 7568  7569  7570  20 -7572 0
 7568  7569  7570  20  7573 0

c  -1-1 --> -2
c    ( b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧  b^{4, 5}_0 ∧ -p_20) -> ( b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0)
c  in CNF:
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨  b^{4, 6}_2
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨  b^{4, 6}_1
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨  p_20 ∨ -b^{4, 6}_0
c  in DIMACS:
-7568  7569 -7570  20  7571 0
-7568  7569 -7570  20  7572 0
-7568  7569 -7570  20 -7573 0

c  -2-1 --> break 
c    ( b^{4, 5}_2 ∧  b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨  b^{4, 5}_0 ∨  p_20 ∨ break
c  in DIMACS:
-7568 -7569  7570  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 5}_2 ∧ -b^{4, 5}_1 ∧ -b^{4, 5}_0 ∧ true) 
c  in CNF:
c    -b^{4, 5}_2 ∨  b^{4, 5}_1 ∨  b^{4, 5}_0 ∨ false 
c  in DIMACS:
-7568  7569  7570  0

c  3 does not represent an automaton state.
c    -(-b^{4, 5}_2 ∧  b^{4, 5}_1 ∧  b^{4, 5}_0 ∧ true) 
c  in CNF:
c     b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ false 
c  in DIMACS:
 7568 -7569 -7570  0
c  -3 does not represent an automaton state.
c    -( b^{4, 5}_2 ∧  b^{4, 5}_1 ∧  b^{4, 5}_0 ∧ true) 
c  in CNF:
c    -b^{4, 5}_2 ∨ -b^{4, 5}_1 ∨ -b^{4, 5}_0 ∨ false 
c  in DIMACS:
-7568 -7569 -7570  0

c i = 6
c  -2+1 --> -1
c    ( b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧  p_24) -> ( b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0)
c  in CNF:
c    -b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨  b^{4, 7}_2
c    -b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_1
c    -b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨  b^{4, 7}_0
c  in DIMACS:
-7571 -7572  7573 -24  7574 0
-7571 -7572  7573 -24 -7575 0
-7571 -7572  7573 -24  7576 0

c  -1+1 --> 0
c    ( b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0 ∧  p_24) -> (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧ -b^{4, 7}_0)
c  in CNF:
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_2
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_1
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_0
c  in DIMACS:
-7571  7572 -7573 -24 -7574 0
-7571  7572 -7573 -24 -7575 0
-7571  7572 -7573 -24 -7576 0

c  0+1 --> 1
c    (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧  p_24) -> (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0)
c  in CNF:
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_2
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_1
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨  b^{4, 7}_0
c  in DIMACS:
 7571  7572  7573 -24 -7574 0
 7571  7572  7573 -24 -7575 0
 7571  7572  7573 -24  7576 0

c  1+1 --> 2
c    (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0 ∧  p_24) -> (-b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0)
c  in CNF:
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_2
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨  b^{4, 7}_1
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ -p_24 ∨ -b^{4, 7}_0
c  in DIMACS:
 7571  7572 -7573 -24 -7574 0
 7571  7572 -7573 -24  7575 0
 7571  7572 -7573 -24 -7576 0

c  2+1 --> break 
c    (-b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧  p_24) -> break
c  in CNF:
c     b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 7571 -7572  7573 -24 1162 0


c  2-1 --> 1
c    (-b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧ -p_24) -> (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0)
c  in CNF:
c     b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_2
c     b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_1
c     b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨  b^{4, 7}_0
c  in DIMACS:
 7571 -7572  7573  24 -7574 0
 7571 -7572  7573  24 -7575 0
 7571 -7572  7573  24  7576 0

c  1-1 --> 0
c    (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0 ∧ -p_24) -> (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧ -b^{4, 7}_0)
c  in CNF:
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_2
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_1
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_0
c  in DIMACS:
 7571  7572 -7573  24 -7574 0
 7571  7572 -7573  24 -7575 0
 7571  7572 -7573  24 -7576 0

c  0-1 --> -1
c    (-b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧ -p_24) -> ( b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0)
c  in CNF:
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨  b^{4, 7}_2
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_1
c     b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨  b^{4, 7}_0
c  in DIMACS:
 7571  7572  7573  24  7574 0
 7571  7572  7573  24 -7575 0
 7571  7572  7573  24  7576 0

c  -1-1 --> -2
c    ( b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧  b^{4, 6}_0 ∧ -p_24) -> ( b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0)
c  in CNF:
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨  b^{4, 7}_2
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨  b^{4, 7}_1
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨  p_24 ∨ -b^{4, 7}_0
c  in DIMACS:
-7571  7572 -7573  24  7574 0
-7571  7572 -7573  24  7575 0
-7571  7572 -7573  24 -7576 0

c  -2-1 --> break 
c    ( b^{4, 6}_2 ∧  b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨  b^{4, 6}_0 ∨  p_24 ∨ break
c  in DIMACS:
-7571 -7572  7573  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 6}_2 ∧ -b^{4, 6}_1 ∧ -b^{4, 6}_0 ∧ true) 
c  in CNF:
c    -b^{4, 6}_2 ∨  b^{4, 6}_1 ∨  b^{4, 6}_0 ∨ false 
c  in DIMACS:
-7571  7572  7573  0

c  3 does not represent an automaton state.
c    -(-b^{4, 6}_2 ∧  b^{4, 6}_1 ∧  b^{4, 6}_0 ∧ true) 
c  in CNF:
c     b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ false 
c  in DIMACS:
 7571 -7572 -7573  0
c  -3 does not represent an automaton state.
c    -( b^{4, 6}_2 ∧  b^{4, 6}_1 ∧  b^{4, 6}_0 ∧ true) 
c  in CNF:
c    -b^{4, 6}_2 ∨ -b^{4, 6}_1 ∨ -b^{4, 6}_0 ∨ false 
c  in DIMACS:
-7571 -7572 -7573  0

c i = 7
c  -2+1 --> -1
c    ( b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧  p_28) -> ( b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0)
c  in CNF:
c    -b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨  b^{4, 8}_2
c    -b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_1
c    -b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨  b^{4, 8}_0
c  in DIMACS:
-7574 -7575  7576 -28  7577 0
-7574 -7575  7576 -28 -7578 0
-7574 -7575  7576 -28  7579 0

c  -1+1 --> 0
c    ( b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0 ∧  p_28) -> (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧ -b^{4, 8}_0)
c  in CNF:
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_2
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_1
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_0
c  in DIMACS:
-7574  7575 -7576 -28 -7577 0
-7574  7575 -7576 -28 -7578 0
-7574  7575 -7576 -28 -7579 0

c  0+1 --> 1
c    (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧  p_28) -> (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0)
c  in CNF:
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_2
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_1
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨  b^{4, 8}_0
c  in DIMACS:
 7574  7575  7576 -28 -7577 0
 7574  7575  7576 -28 -7578 0
 7574  7575  7576 -28  7579 0

c  1+1 --> 2
c    (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0 ∧  p_28) -> (-b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0)
c  in CNF:
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_2
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨  b^{4, 8}_1
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ -p_28 ∨ -b^{4, 8}_0
c  in DIMACS:
 7574  7575 -7576 -28 -7577 0
 7574  7575 -7576 -28  7578 0
 7574  7575 -7576 -28 -7579 0

c  2+1 --> break 
c    (-b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧  p_28) -> break
c  in CNF:
c     b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 7574 -7575  7576 -28 1162 0


c  2-1 --> 1
c    (-b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧ -p_28) -> (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0)
c  in CNF:
c     b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_2
c     b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_1
c     b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨  b^{4, 8}_0
c  in DIMACS:
 7574 -7575  7576  28 -7577 0
 7574 -7575  7576  28 -7578 0
 7574 -7575  7576  28  7579 0

c  1-1 --> 0
c    (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0 ∧ -p_28) -> (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧ -b^{4, 8}_0)
c  in CNF:
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_2
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_1
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_0
c  in DIMACS:
 7574  7575 -7576  28 -7577 0
 7574  7575 -7576  28 -7578 0
 7574  7575 -7576  28 -7579 0

c  0-1 --> -1
c    (-b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧ -p_28) -> ( b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0)
c  in CNF:
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨  b^{4, 8}_2
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_1
c     b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨  b^{4, 8}_0
c  in DIMACS:
 7574  7575  7576  28  7577 0
 7574  7575  7576  28 -7578 0
 7574  7575  7576  28  7579 0

c  -1-1 --> -2
c    ( b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧  b^{4, 7}_0 ∧ -p_28) -> ( b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0)
c  in CNF:
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨  b^{4, 8}_2
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨  b^{4, 8}_1
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨  p_28 ∨ -b^{4, 8}_0
c  in DIMACS:
-7574  7575 -7576  28  7577 0
-7574  7575 -7576  28  7578 0
-7574  7575 -7576  28 -7579 0

c  -2-1 --> break 
c    ( b^{4, 7}_2 ∧  b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨  b^{4, 7}_0 ∨  p_28 ∨ break
c  in DIMACS:
-7574 -7575  7576  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 7}_2 ∧ -b^{4, 7}_1 ∧ -b^{4, 7}_0 ∧ true) 
c  in CNF:
c    -b^{4, 7}_2 ∨  b^{4, 7}_1 ∨  b^{4, 7}_0 ∨ false 
c  in DIMACS:
-7574  7575  7576  0

c  3 does not represent an automaton state.
c    -(-b^{4, 7}_2 ∧  b^{4, 7}_1 ∧  b^{4, 7}_0 ∧ true) 
c  in CNF:
c     b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ false 
c  in DIMACS:
 7574 -7575 -7576  0
c  -3 does not represent an automaton state.
c    -( b^{4, 7}_2 ∧  b^{4, 7}_1 ∧  b^{4, 7}_0 ∧ true) 
c  in CNF:
c    -b^{4, 7}_2 ∨ -b^{4, 7}_1 ∨ -b^{4, 7}_0 ∨ false 
c  in DIMACS:
-7574 -7575 -7576  0

c i = 8
c  -2+1 --> -1
c    ( b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧  p_32) -> ( b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0)
c  in CNF:
c    -b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨  b^{4, 9}_2
c    -b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_1
c    -b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨  b^{4, 9}_0
c  in DIMACS:
-7577 -7578  7579 -32  7580 0
-7577 -7578  7579 -32 -7581 0
-7577 -7578  7579 -32  7582 0

c  -1+1 --> 0
c    ( b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0 ∧  p_32) -> (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧ -b^{4, 9}_0)
c  in CNF:
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_2
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_1
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_0
c  in DIMACS:
-7577  7578 -7579 -32 -7580 0
-7577  7578 -7579 -32 -7581 0
-7577  7578 -7579 -32 -7582 0

c  0+1 --> 1
c    (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧  p_32) -> (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0)
c  in CNF:
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_2
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_1
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨  b^{4, 9}_0
c  in DIMACS:
 7577  7578  7579 -32 -7580 0
 7577  7578  7579 -32 -7581 0
 7577  7578  7579 -32  7582 0

c  1+1 --> 2
c    (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0 ∧  p_32) -> (-b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0)
c  in CNF:
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_2
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨  b^{4, 9}_1
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ -p_32 ∨ -b^{4, 9}_0
c  in DIMACS:
 7577  7578 -7579 -32 -7580 0
 7577  7578 -7579 -32  7581 0
 7577  7578 -7579 -32 -7582 0

c  2+1 --> break 
c    (-b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧  p_32) -> break
c  in CNF:
c     b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 7577 -7578  7579 -32 1162 0


c  2-1 --> 1
c    (-b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧ -p_32) -> (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0)
c  in CNF:
c     b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_2
c     b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_1
c     b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨  b^{4, 9}_0
c  in DIMACS:
 7577 -7578  7579  32 -7580 0
 7577 -7578  7579  32 -7581 0
 7577 -7578  7579  32  7582 0

c  1-1 --> 0
c    (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0 ∧ -p_32) -> (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧ -b^{4, 9}_0)
c  in CNF:
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_2
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_1
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_0
c  in DIMACS:
 7577  7578 -7579  32 -7580 0
 7577  7578 -7579  32 -7581 0
 7577  7578 -7579  32 -7582 0

c  0-1 --> -1
c    (-b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧ -p_32) -> ( b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0)
c  in CNF:
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨  b^{4, 9}_2
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_1
c     b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨  b^{4, 9}_0
c  in DIMACS:
 7577  7578  7579  32  7580 0
 7577  7578  7579  32 -7581 0
 7577  7578  7579  32  7582 0

c  -1-1 --> -2
c    ( b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧  b^{4, 8}_0 ∧ -p_32) -> ( b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0)
c  in CNF:
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨  b^{4, 9}_2
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨  b^{4, 9}_1
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨  p_32 ∨ -b^{4, 9}_0
c  in DIMACS:
-7577  7578 -7579  32  7580 0
-7577  7578 -7579  32  7581 0
-7577  7578 -7579  32 -7582 0

c  -2-1 --> break 
c    ( b^{4, 8}_2 ∧  b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨  b^{4, 8}_0 ∨  p_32 ∨ break
c  in DIMACS:
-7577 -7578  7579  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 8}_2 ∧ -b^{4, 8}_1 ∧ -b^{4, 8}_0 ∧ true) 
c  in CNF:
c    -b^{4, 8}_2 ∨  b^{4, 8}_1 ∨  b^{4, 8}_0 ∨ false 
c  in DIMACS:
-7577  7578  7579  0

c  3 does not represent an automaton state.
c    -(-b^{4, 8}_2 ∧  b^{4, 8}_1 ∧  b^{4, 8}_0 ∧ true) 
c  in CNF:
c     b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ false 
c  in DIMACS:
 7577 -7578 -7579  0
c  -3 does not represent an automaton state.
c    -( b^{4, 8}_2 ∧  b^{4, 8}_1 ∧  b^{4, 8}_0 ∧ true) 
c  in CNF:
c    -b^{4, 8}_2 ∨ -b^{4, 8}_1 ∨ -b^{4, 8}_0 ∨ false 
c  in DIMACS:
-7577 -7578 -7579  0

c i = 9
c  -2+1 --> -1
c    ( b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧  p_36) -> ( b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0)
c  in CNF:
c    -b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨  b^{4, 10}_2
c    -b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_1
c    -b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨  b^{4, 10}_0
c  in DIMACS:
-7580 -7581  7582 -36  7583 0
-7580 -7581  7582 -36 -7584 0
-7580 -7581  7582 -36  7585 0

c  -1+1 --> 0
c    ( b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0 ∧  p_36) -> (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧ -b^{4, 10}_0)
c  in CNF:
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_2
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_1
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_0
c  in DIMACS:
-7580  7581 -7582 -36 -7583 0
-7580  7581 -7582 -36 -7584 0
-7580  7581 -7582 -36 -7585 0

c  0+1 --> 1
c    (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧  p_36) -> (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0)
c  in CNF:
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_2
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_1
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨  b^{4, 10}_0
c  in DIMACS:
 7580  7581  7582 -36 -7583 0
 7580  7581  7582 -36 -7584 0
 7580  7581  7582 -36  7585 0

c  1+1 --> 2
c    (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0 ∧  p_36) -> (-b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0)
c  in CNF:
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_2
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨  b^{4, 10}_1
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ -p_36 ∨ -b^{4, 10}_0
c  in DIMACS:
 7580  7581 -7582 -36 -7583 0
 7580  7581 -7582 -36  7584 0
 7580  7581 -7582 -36 -7585 0

c  2+1 --> break 
c    (-b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧  p_36) -> break
c  in CNF:
c     b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 7580 -7581  7582 -36 1162 0


c  2-1 --> 1
c    (-b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧ -p_36) -> (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0)
c  in CNF:
c     b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_2
c     b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_1
c     b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨  b^{4, 10}_0
c  in DIMACS:
 7580 -7581  7582  36 -7583 0
 7580 -7581  7582  36 -7584 0
 7580 -7581  7582  36  7585 0

c  1-1 --> 0
c    (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0 ∧ -p_36) -> (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧ -b^{4, 10}_0)
c  in CNF:
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_2
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_1
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_0
c  in DIMACS:
 7580  7581 -7582  36 -7583 0
 7580  7581 -7582  36 -7584 0
 7580  7581 -7582  36 -7585 0

c  0-1 --> -1
c    (-b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧ -p_36) -> ( b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0)
c  in CNF:
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨  b^{4, 10}_2
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_1
c     b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨  b^{4, 10}_0
c  in DIMACS:
 7580  7581  7582  36  7583 0
 7580  7581  7582  36 -7584 0
 7580  7581  7582  36  7585 0

c  -1-1 --> -2
c    ( b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧  b^{4, 9}_0 ∧ -p_36) -> ( b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0)
c  in CNF:
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨  b^{4, 10}_2
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨  b^{4, 10}_1
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨  p_36 ∨ -b^{4, 10}_0
c  in DIMACS:
-7580  7581 -7582  36  7583 0
-7580  7581 -7582  36  7584 0
-7580  7581 -7582  36 -7585 0

c  -2-1 --> break 
c    ( b^{4, 9}_2 ∧  b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨  b^{4, 9}_0 ∨  p_36 ∨ break
c  in DIMACS:
-7580 -7581  7582  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 9}_2 ∧ -b^{4, 9}_1 ∧ -b^{4, 9}_0 ∧ true) 
c  in CNF:
c    -b^{4, 9}_2 ∨  b^{4, 9}_1 ∨  b^{4, 9}_0 ∨ false 
c  in DIMACS:
-7580  7581  7582  0

c  3 does not represent an automaton state.
c    -(-b^{4, 9}_2 ∧  b^{4, 9}_1 ∧  b^{4, 9}_0 ∧ true) 
c  in CNF:
c     b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ false 
c  in DIMACS:
 7580 -7581 -7582  0
c  -3 does not represent an automaton state.
c    -( b^{4, 9}_2 ∧  b^{4, 9}_1 ∧  b^{4, 9}_0 ∧ true) 
c  in CNF:
c    -b^{4, 9}_2 ∨ -b^{4, 9}_1 ∨ -b^{4, 9}_0 ∨ false 
c  in DIMACS:
-7580 -7581 -7582  0

c i = 10
c  -2+1 --> -1
c    ( b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧  p_40) -> ( b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0)
c  in CNF:
c    -b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨  b^{4, 11}_2
c    -b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_1
c    -b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨  b^{4, 11}_0
c  in DIMACS:
-7583 -7584  7585 -40  7586 0
-7583 -7584  7585 -40 -7587 0
-7583 -7584  7585 -40  7588 0

c  -1+1 --> 0
c    ( b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0 ∧  p_40) -> (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧ -b^{4, 11}_0)
c  in CNF:
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_2
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_1
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_0
c  in DIMACS:
-7583  7584 -7585 -40 -7586 0
-7583  7584 -7585 -40 -7587 0
-7583  7584 -7585 -40 -7588 0

c  0+1 --> 1
c    (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧  p_40) -> (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0)
c  in CNF:
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_2
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_1
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨  b^{4, 11}_0
c  in DIMACS:
 7583  7584  7585 -40 -7586 0
 7583  7584  7585 -40 -7587 0
 7583  7584  7585 -40  7588 0

c  1+1 --> 2
c    (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0 ∧  p_40) -> (-b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0)
c  in CNF:
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_2
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨  b^{4, 11}_1
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ -p_40 ∨ -b^{4, 11}_0
c  in DIMACS:
 7583  7584 -7585 -40 -7586 0
 7583  7584 -7585 -40  7587 0
 7583  7584 -7585 -40 -7588 0

c  2+1 --> break 
c    (-b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧  p_40) -> break
c  in CNF:
c     b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 7583 -7584  7585 -40 1162 0


c  2-1 --> 1
c    (-b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧ -p_40) -> (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0)
c  in CNF:
c     b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_2
c     b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_1
c     b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨  b^{4, 11}_0
c  in DIMACS:
 7583 -7584  7585  40 -7586 0
 7583 -7584  7585  40 -7587 0
 7583 -7584  7585  40  7588 0

c  1-1 --> 0
c    (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0 ∧ -p_40) -> (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧ -b^{4, 11}_0)
c  in CNF:
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_2
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_1
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_0
c  in DIMACS:
 7583  7584 -7585  40 -7586 0
 7583  7584 -7585  40 -7587 0
 7583  7584 -7585  40 -7588 0

c  0-1 --> -1
c    (-b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧ -p_40) -> ( b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0)
c  in CNF:
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨  b^{4, 11}_2
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_1
c     b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨  b^{4, 11}_0
c  in DIMACS:
 7583  7584  7585  40  7586 0
 7583  7584  7585  40 -7587 0
 7583  7584  7585  40  7588 0

c  -1-1 --> -2
c    ( b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧  b^{4, 10}_0 ∧ -p_40) -> ( b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0)
c  in CNF:
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨  b^{4, 11}_2
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨  b^{4, 11}_1
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨  p_40 ∨ -b^{4, 11}_0
c  in DIMACS:
-7583  7584 -7585  40  7586 0
-7583  7584 -7585  40  7587 0
-7583  7584 -7585  40 -7588 0

c  -2-1 --> break 
c    ( b^{4, 10}_2 ∧  b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨  b^{4, 10}_0 ∨  p_40 ∨ break
c  in DIMACS:
-7583 -7584  7585  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 10}_2 ∧ -b^{4, 10}_1 ∧ -b^{4, 10}_0 ∧ true) 
c  in CNF:
c    -b^{4, 10}_2 ∨  b^{4, 10}_1 ∨  b^{4, 10}_0 ∨ false 
c  in DIMACS:
-7583  7584  7585  0

c  3 does not represent an automaton state.
c    -(-b^{4, 10}_2 ∧  b^{4, 10}_1 ∧  b^{4, 10}_0 ∧ true) 
c  in CNF:
c     b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ false 
c  in DIMACS:
 7583 -7584 -7585  0
c  -3 does not represent an automaton state.
c    -( b^{4, 10}_2 ∧  b^{4, 10}_1 ∧  b^{4, 10}_0 ∧ true) 
c  in CNF:
c    -b^{4, 10}_2 ∨ -b^{4, 10}_1 ∨ -b^{4, 10}_0 ∨ false 
c  in DIMACS:
-7583 -7584 -7585  0

c i = 11
c  -2+1 --> -1
c    ( b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧  p_44) -> ( b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0)
c  in CNF:
c    -b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨  b^{4, 12}_2
c    -b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_1
c    -b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨  b^{4, 12}_0
c  in DIMACS:
-7586 -7587  7588 -44  7589 0
-7586 -7587  7588 -44 -7590 0
-7586 -7587  7588 -44  7591 0

c  -1+1 --> 0
c    ( b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0 ∧  p_44) -> (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧ -b^{4, 12}_0)
c  in CNF:
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_2
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_1
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_0
c  in DIMACS:
-7586  7587 -7588 -44 -7589 0
-7586  7587 -7588 -44 -7590 0
-7586  7587 -7588 -44 -7591 0

c  0+1 --> 1
c    (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧  p_44) -> (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0)
c  in CNF:
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_2
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_1
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨  b^{4, 12}_0
c  in DIMACS:
 7586  7587  7588 -44 -7589 0
 7586  7587  7588 -44 -7590 0
 7586  7587  7588 -44  7591 0

c  1+1 --> 2
c    (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0 ∧  p_44) -> (-b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0)
c  in CNF:
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_2
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨  b^{4, 12}_1
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ -p_44 ∨ -b^{4, 12}_0
c  in DIMACS:
 7586  7587 -7588 -44 -7589 0
 7586  7587 -7588 -44  7590 0
 7586  7587 -7588 -44 -7591 0

c  2+1 --> break 
c    (-b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧  p_44) -> break
c  in CNF:
c     b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 7586 -7587  7588 -44 1162 0


c  2-1 --> 1
c    (-b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧ -p_44) -> (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0)
c  in CNF:
c     b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_2
c     b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_1
c     b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨  b^{4, 12}_0
c  in DIMACS:
 7586 -7587  7588  44 -7589 0
 7586 -7587  7588  44 -7590 0
 7586 -7587  7588  44  7591 0

c  1-1 --> 0
c    (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0 ∧ -p_44) -> (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧ -b^{4, 12}_0)
c  in CNF:
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_2
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_1
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_0
c  in DIMACS:
 7586  7587 -7588  44 -7589 0
 7586  7587 -7588  44 -7590 0
 7586  7587 -7588  44 -7591 0

c  0-1 --> -1
c    (-b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧ -p_44) -> ( b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0)
c  in CNF:
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨  b^{4, 12}_2
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_1
c     b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨  b^{4, 12}_0
c  in DIMACS:
 7586  7587  7588  44  7589 0
 7586  7587  7588  44 -7590 0
 7586  7587  7588  44  7591 0

c  -1-1 --> -2
c    ( b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧  b^{4, 11}_0 ∧ -p_44) -> ( b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0)
c  in CNF:
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨  b^{4, 12}_2
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨  b^{4, 12}_1
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨  p_44 ∨ -b^{4, 12}_0
c  in DIMACS:
-7586  7587 -7588  44  7589 0
-7586  7587 -7588  44  7590 0
-7586  7587 -7588  44 -7591 0

c  -2-1 --> break 
c    ( b^{4, 11}_2 ∧  b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨  b^{4, 11}_0 ∨  p_44 ∨ break
c  in DIMACS:
-7586 -7587  7588  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 11}_2 ∧ -b^{4, 11}_1 ∧ -b^{4, 11}_0 ∧ true) 
c  in CNF:
c    -b^{4, 11}_2 ∨  b^{4, 11}_1 ∨  b^{4, 11}_0 ∨ false 
c  in DIMACS:
-7586  7587  7588  0

c  3 does not represent an automaton state.
c    -(-b^{4, 11}_2 ∧  b^{4, 11}_1 ∧  b^{4, 11}_0 ∧ true) 
c  in CNF:
c     b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ false 
c  in DIMACS:
 7586 -7587 -7588  0
c  -3 does not represent an automaton state.
c    -( b^{4, 11}_2 ∧  b^{4, 11}_1 ∧  b^{4, 11}_0 ∧ true) 
c  in CNF:
c    -b^{4, 11}_2 ∨ -b^{4, 11}_1 ∨ -b^{4, 11}_0 ∨ false 
c  in DIMACS:
-7586 -7587 -7588  0

c i = 12
c  -2+1 --> -1
c    ( b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧  p_48) -> ( b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0)
c  in CNF:
c    -b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨  b^{4, 13}_2
c    -b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_1
c    -b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨  b^{4, 13}_0
c  in DIMACS:
-7589 -7590  7591 -48  7592 0
-7589 -7590  7591 -48 -7593 0
-7589 -7590  7591 -48  7594 0

c  -1+1 --> 0
c    ( b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0 ∧  p_48) -> (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧ -b^{4, 13}_0)
c  in CNF:
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_2
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_1
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_0
c  in DIMACS:
-7589  7590 -7591 -48 -7592 0
-7589  7590 -7591 -48 -7593 0
-7589  7590 -7591 -48 -7594 0

c  0+1 --> 1
c    (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧  p_48) -> (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0)
c  in CNF:
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_2
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_1
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨  b^{4, 13}_0
c  in DIMACS:
 7589  7590  7591 -48 -7592 0
 7589  7590  7591 -48 -7593 0
 7589  7590  7591 -48  7594 0

c  1+1 --> 2
c    (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0 ∧  p_48) -> (-b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0)
c  in CNF:
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_2
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨  b^{4, 13}_1
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ -p_48 ∨ -b^{4, 13}_0
c  in DIMACS:
 7589  7590 -7591 -48 -7592 0
 7589  7590 -7591 -48  7593 0
 7589  7590 -7591 -48 -7594 0

c  2+1 --> break 
c    (-b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧  p_48) -> break
c  in CNF:
c     b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 7589 -7590  7591 -48 1162 0


c  2-1 --> 1
c    (-b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧ -p_48) -> (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0)
c  in CNF:
c     b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_2
c     b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_1
c     b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨  b^{4, 13}_0
c  in DIMACS:
 7589 -7590  7591  48 -7592 0
 7589 -7590  7591  48 -7593 0
 7589 -7590  7591  48  7594 0

c  1-1 --> 0
c    (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0 ∧ -p_48) -> (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧ -b^{4, 13}_0)
c  in CNF:
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_2
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_1
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_0
c  in DIMACS:
 7589  7590 -7591  48 -7592 0
 7589  7590 -7591  48 -7593 0
 7589  7590 -7591  48 -7594 0

c  0-1 --> -1
c    (-b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧ -p_48) -> ( b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0)
c  in CNF:
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨  b^{4, 13}_2
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_1
c     b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨  b^{4, 13}_0
c  in DIMACS:
 7589  7590  7591  48  7592 0
 7589  7590  7591  48 -7593 0
 7589  7590  7591  48  7594 0

c  -1-1 --> -2
c    ( b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧  b^{4, 12}_0 ∧ -p_48) -> ( b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0)
c  in CNF:
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨  b^{4, 13}_2
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨  b^{4, 13}_1
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨  p_48 ∨ -b^{4, 13}_0
c  in DIMACS:
-7589  7590 -7591  48  7592 0
-7589  7590 -7591  48  7593 0
-7589  7590 -7591  48 -7594 0

c  -2-1 --> break 
c    ( b^{4, 12}_2 ∧  b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨  b^{4, 12}_0 ∨  p_48 ∨ break
c  in DIMACS:
-7589 -7590  7591  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 12}_2 ∧ -b^{4, 12}_1 ∧ -b^{4, 12}_0 ∧ true) 
c  in CNF:
c    -b^{4, 12}_2 ∨  b^{4, 12}_1 ∨  b^{4, 12}_0 ∨ false 
c  in DIMACS:
-7589  7590  7591  0

c  3 does not represent an automaton state.
c    -(-b^{4, 12}_2 ∧  b^{4, 12}_1 ∧  b^{4, 12}_0 ∧ true) 
c  in CNF:
c     b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ false 
c  in DIMACS:
 7589 -7590 -7591  0
c  -3 does not represent an automaton state.
c    -( b^{4, 12}_2 ∧  b^{4, 12}_1 ∧  b^{4, 12}_0 ∧ true) 
c  in CNF:
c    -b^{4, 12}_2 ∨ -b^{4, 12}_1 ∨ -b^{4, 12}_0 ∨ false 
c  in DIMACS:
-7589 -7590 -7591  0

c i = 13
c  -2+1 --> -1
c    ( b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧  p_52) -> ( b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0)
c  in CNF:
c    -b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨  b^{4, 14}_2
c    -b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_1
c    -b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨  b^{4, 14}_0
c  in DIMACS:
-7592 -7593  7594 -52  7595 0
-7592 -7593  7594 -52 -7596 0
-7592 -7593  7594 -52  7597 0

c  -1+1 --> 0
c    ( b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0 ∧  p_52) -> (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧ -b^{4, 14}_0)
c  in CNF:
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_2
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_1
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_0
c  in DIMACS:
-7592  7593 -7594 -52 -7595 0
-7592  7593 -7594 -52 -7596 0
-7592  7593 -7594 -52 -7597 0

c  0+1 --> 1
c    (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧  p_52) -> (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0)
c  in CNF:
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_2
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_1
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨  b^{4, 14}_0
c  in DIMACS:
 7592  7593  7594 -52 -7595 0
 7592  7593  7594 -52 -7596 0
 7592  7593  7594 -52  7597 0

c  1+1 --> 2
c    (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0 ∧  p_52) -> (-b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0)
c  in CNF:
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_2
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨  b^{4, 14}_1
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ -p_52 ∨ -b^{4, 14}_0
c  in DIMACS:
 7592  7593 -7594 -52 -7595 0
 7592  7593 -7594 -52  7596 0
 7592  7593 -7594 -52 -7597 0

c  2+1 --> break 
c    (-b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧  p_52) -> break
c  in CNF:
c     b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 7592 -7593  7594 -52 1162 0


c  2-1 --> 1
c    (-b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧ -p_52) -> (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0)
c  in CNF:
c     b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_2
c     b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_1
c     b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨  b^{4, 14}_0
c  in DIMACS:
 7592 -7593  7594  52 -7595 0
 7592 -7593  7594  52 -7596 0
 7592 -7593  7594  52  7597 0

c  1-1 --> 0
c    (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0 ∧ -p_52) -> (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧ -b^{4, 14}_0)
c  in CNF:
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_2
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_1
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_0
c  in DIMACS:
 7592  7593 -7594  52 -7595 0
 7592  7593 -7594  52 -7596 0
 7592  7593 -7594  52 -7597 0

c  0-1 --> -1
c    (-b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧ -p_52) -> ( b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0)
c  in CNF:
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨  b^{4, 14}_2
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_1
c     b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨  b^{4, 14}_0
c  in DIMACS:
 7592  7593  7594  52  7595 0
 7592  7593  7594  52 -7596 0
 7592  7593  7594  52  7597 0

c  -1-1 --> -2
c    ( b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧  b^{4, 13}_0 ∧ -p_52) -> ( b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0)
c  in CNF:
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨  b^{4, 14}_2
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨  b^{4, 14}_1
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨  p_52 ∨ -b^{4, 14}_0
c  in DIMACS:
-7592  7593 -7594  52  7595 0
-7592  7593 -7594  52  7596 0
-7592  7593 -7594  52 -7597 0

c  -2-1 --> break 
c    ( b^{4, 13}_2 ∧  b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨  b^{4, 13}_0 ∨  p_52 ∨ break
c  in DIMACS:
-7592 -7593  7594  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 13}_2 ∧ -b^{4, 13}_1 ∧ -b^{4, 13}_0 ∧ true) 
c  in CNF:
c    -b^{4, 13}_2 ∨  b^{4, 13}_1 ∨  b^{4, 13}_0 ∨ false 
c  in DIMACS:
-7592  7593  7594  0

c  3 does not represent an automaton state.
c    -(-b^{4, 13}_2 ∧  b^{4, 13}_1 ∧  b^{4, 13}_0 ∧ true) 
c  in CNF:
c     b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ false 
c  in DIMACS:
 7592 -7593 -7594  0
c  -3 does not represent an automaton state.
c    -( b^{4, 13}_2 ∧  b^{4, 13}_1 ∧  b^{4, 13}_0 ∧ true) 
c  in CNF:
c    -b^{4, 13}_2 ∨ -b^{4, 13}_1 ∨ -b^{4, 13}_0 ∨ false 
c  in DIMACS:
-7592 -7593 -7594  0

c i = 14
c  -2+1 --> -1
c    ( b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧  p_56) -> ( b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0)
c  in CNF:
c    -b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨  b^{4, 15}_2
c    -b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_1
c    -b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨  b^{4, 15}_0
c  in DIMACS:
-7595 -7596  7597 -56  7598 0
-7595 -7596  7597 -56 -7599 0
-7595 -7596  7597 -56  7600 0

c  -1+1 --> 0
c    ( b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0 ∧  p_56) -> (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧ -b^{4, 15}_0)
c  in CNF:
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_2
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_1
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_0
c  in DIMACS:
-7595  7596 -7597 -56 -7598 0
-7595  7596 -7597 -56 -7599 0
-7595  7596 -7597 -56 -7600 0

c  0+1 --> 1
c    (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧  p_56) -> (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0)
c  in CNF:
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_2
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_1
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨  b^{4, 15}_0
c  in DIMACS:
 7595  7596  7597 -56 -7598 0
 7595  7596  7597 -56 -7599 0
 7595  7596  7597 -56  7600 0

c  1+1 --> 2
c    (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0 ∧  p_56) -> (-b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0)
c  in CNF:
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_2
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨  b^{4, 15}_1
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ -p_56 ∨ -b^{4, 15}_0
c  in DIMACS:
 7595  7596 -7597 -56 -7598 0
 7595  7596 -7597 -56  7599 0
 7595  7596 -7597 -56 -7600 0

c  2+1 --> break 
c    (-b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧  p_56) -> break
c  in CNF:
c     b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 7595 -7596  7597 -56 1162 0


c  2-1 --> 1
c    (-b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧ -p_56) -> (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0)
c  in CNF:
c     b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_2
c     b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_1
c     b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨  b^{4, 15}_0
c  in DIMACS:
 7595 -7596  7597  56 -7598 0
 7595 -7596  7597  56 -7599 0
 7595 -7596  7597  56  7600 0

c  1-1 --> 0
c    (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0 ∧ -p_56) -> (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧ -b^{4, 15}_0)
c  in CNF:
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_2
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_1
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_0
c  in DIMACS:
 7595  7596 -7597  56 -7598 0
 7595  7596 -7597  56 -7599 0
 7595  7596 -7597  56 -7600 0

c  0-1 --> -1
c    (-b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧ -p_56) -> ( b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0)
c  in CNF:
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨  b^{4, 15}_2
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_1
c     b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨  b^{4, 15}_0
c  in DIMACS:
 7595  7596  7597  56  7598 0
 7595  7596  7597  56 -7599 0
 7595  7596  7597  56  7600 0

c  -1-1 --> -2
c    ( b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧  b^{4, 14}_0 ∧ -p_56) -> ( b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0)
c  in CNF:
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨  b^{4, 15}_2
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨  b^{4, 15}_1
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨  p_56 ∨ -b^{4, 15}_0
c  in DIMACS:
-7595  7596 -7597  56  7598 0
-7595  7596 -7597  56  7599 0
-7595  7596 -7597  56 -7600 0

c  -2-1 --> break 
c    ( b^{4, 14}_2 ∧  b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨  b^{4, 14}_0 ∨  p_56 ∨ break
c  in DIMACS:
-7595 -7596  7597  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 14}_2 ∧ -b^{4, 14}_1 ∧ -b^{4, 14}_0 ∧ true) 
c  in CNF:
c    -b^{4, 14}_2 ∨  b^{4, 14}_1 ∨  b^{4, 14}_0 ∨ false 
c  in DIMACS:
-7595  7596  7597  0

c  3 does not represent an automaton state.
c    -(-b^{4, 14}_2 ∧  b^{4, 14}_1 ∧  b^{4, 14}_0 ∧ true) 
c  in CNF:
c     b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ false 
c  in DIMACS:
 7595 -7596 -7597  0
c  -3 does not represent an automaton state.
c    -( b^{4, 14}_2 ∧  b^{4, 14}_1 ∧  b^{4, 14}_0 ∧ true) 
c  in CNF:
c    -b^{4, 14}_2 ∨ -b^{4, 14}_1 ∨ -b^{4, 14}_0 ∨ false 
c  in DIMACS:
-7595 -7596 -7597  0

c i = 15
c  -2+1 --> -1
c    ( b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧  p_60) -> ( b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0)
c  in CNF:
c    -b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨  b^{4, 16}_2
c    -b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_1
c    -b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨  b^{4, 16}_0
c  in DIMACS:
-7598 -7599  7600 -60  7601 0
-7598 -7599  7600 -60 -7602 0
-7598 -7599  7600 -60  7603 0

c  -1+1 --> 0
c    ( b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0 ∧  p_60) -> (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧ -b^{4, 16}_0)
c  in CNF:
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_2
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_1
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_0
c  in DIMACS:
-7598  7599 -7600 -60 -7601 0
-7598  7599 -7600 -60 -7602 0
-7598  7599 -7600 -60 -7603 0

c  0+1 --> 1
c    (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧  p_60) -> (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0)
c  in CNF:
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_2
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_1
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨  b^{4, 16}_0
c  in DIMACS:
 7598  7599  7600 -60 -7601 0
 7598  7599  7600 -60 -7602 0
 7598  7599  7600 -60  7603 0

c  1+1 --> 2
c    (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0 ∧  p_60) -> (-b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0)
c  in CNF:
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_2
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨  b^{4, 16}_1
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ -p_60 ∨ -b^{4, 16}_0
c  in DIMACS:
 7598  7599 -7600 -60 -7601 0
 7598  7599 -7600 -60  7602 0
 7598  7599 -7600 -60 -7603 0

c  2+1 --> break 
c    (-b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧  p_60) -> break
c  in CNF:
c     b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 7598 -7599  7600 -60 1162 0


c  2-1 --> 1
c    (-b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧ -p_60) -> (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0)
c  in CNF:
c     b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_2
c     b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_1
c     b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨  b^{4, 16}_0
c  in DIMACS:
 7598 -7599  7600  60 -7601 0
 7598 -7599  7600  60 -7602 0
 7598 -7599  7600  60  7603 0

c  1-1 --> 0
c    (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0 ∧ -p_60) -> (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧ -b^{4, 16}_0)
c  in CNF:
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_2
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_1
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_0
c  in DIMACS:
 7598  7599 -7600  60 -7601 0
 7598  7599 -7600  60 -7602 0
 7598  7599 -7600  60 -7603 0

c  0-1 --> -1
c    (-b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧ -p_60) -> ( b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0)
c  in CNF:
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨  b^{4, 16}_2
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_1
c     b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨  b^{4, 16}_0
c  in DIMACS:
 7598  7599  7600  60  7601 0
 7598  7599  7600  60 -7602 0
 7598  7599  7600  60  7603 0

c  -1-1 --> -2
c    ( b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧  b^{4, 15}_0 ∧ -p_60) -> ( b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0)
c  in CNF:
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨  b^{4, 16}_2
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨  b^{4, 16}_1
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨  p_60 ∨ -b^{4, 16}_0
c  in DIMACS:
-7598  7599 -7600  60  7601 0
-7598  7599 -7600  60  7602 0
-7598  7599 -7600  60 -7603 0

c  -2-1 --> break 
c    ( b^{4, 15}_2 ∧  b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨  b^{4, 15}_0 ∨  p_60 ∨ break
c  in DIMACS:
-7598 -7599  7600  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 15}_2 ∧ -b^{4, 15}_1 ∧ -b^{4, 15}_0 ∧ true) 
c  in CNF:
c    -b^{4, 15}_2 ∨  b^{4, 15}_1 ∨  b^{4, 15}_0 ∨ false 
c  in DIMACS:
-7598  7599  7600  0

c  3 does not represent an automaton state.
c    -(-b^{4, 15}_2 ∧  b^{4, 15}_1 ∧  b^{4, 15}_0 ∧ true) 
c  in CNF:
c     b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ false 
c  in DIMACS:
 7598 -7599 -7600  0
c  -3 does not represent an automaton state.
c    -( b^{4, 15}_2 ∧  b^{4, 15}_1 ∧  b^{4, 15}_0 ∧ true) 
c  in CNF:
c    -b^{4, 15}_2 ∨ -b^{4, 15}_1 ∨ -b^{4, 15}_0 ∨ false 
c  in DIMACS:
-7598 -7599 -7600  0

c i = 16
c  -2+1 --> -1
c    ( b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧  p_64) -> ( b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0)
c  in CNF:
c    -b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨  b^{4, 17}_2
c    -b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_1
c    -b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨  b^{4, 17}_0
c  in DIMACS:
-7601 -7602  7603 -64  7604 0
-7601 -7602  7603 -64 -7605 0
-7601 -7602  7603 -64  7606 0

c  -1+1 --> 0
c    ( b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0 ∧  p_64) -> (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧ -b^{4, 17}_0)
c  in CNF:
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_2
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_1
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_0
c  in DIMACS:
-7601  7602 -7603 -64 -7604 0
-7601  7602 -7603 -64 -7605 0
-7601  7602 -7603 -64 -7606 0

c  0+1 --> 1
c    (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧  p_64) -> (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0)
c  in CNF:
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_2
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_1
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨  b^{4, 17}_0
c  in DIMACS:
 7601  7602  7603 -64 -7604 0
 7601  7602  7603 -64 -7605 0
 7601  7602  7603 -64  7606 0

c  1+1 --> 2
c    (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0 ∧  p_64) -> (-b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0)
c  in CNF:
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_2
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨  b^{4, 17}_1
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ -p_64 ∨ -b^{4, 17}_0
c  in DIMACS:
 7601  7602 -7603 -64 -7604 0
 7601  7602 -7603 -64  7605 0
 7601  7602 -7603 -64 -7606 0

c  2+1 --> break 
c    (-b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧  p_64) -> break
c  in CNF:
c     b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 7601 -7602  7603 -64 1162 0


c  2-1 --> 1
c    (-b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧ -p_64) -> (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0)
c  in CNF:
c     b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_2
c     b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_1
c     b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨  b^{4, 17}_0
c  in DIMACS:
 7601 -7602  7603  64 -7604 0
 7601 -7602  7603  64 -7605 0
 7601 -7602  7603  64  7606 0

c  1-1 --> 0
c    (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0 ∧ -p_64) -> (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧ -b^{4, 17}_0)
c  in CNF:
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_2
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_1
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_0
c  in DIMACS:
 7601  7602 -7603  64 -7604 0
 7601  7602 -7603  64 -7605 0
 7601  7602 -7603  64 -7606 0

c  0-1 --> -1
c    (-b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧ -p_64) -> ( b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0)
c  in CNF:
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨  b^{4, 17}_2
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_1
c     b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨  b^{4, 17}_0
c  in DIMACS:
 7601  7602  7603  64  7604 0
 7601  7602  7603  64 -7605 0
 7601  7602  7603  64  7606 0

c  -1-1 --> -2
c    ( b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧  b^{4, 16}_0 ∧ -p_64) -> ( b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0)
c  in CNF:
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨  b^{4, 17}_2
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨  b^{4, 17}_1
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨  p_64 ∨ -b^{4, 17}_0
c  in DIMACS:
-7601  7602 -7603  64  7604 0
-7601  7602 -7603  64  7605 0
-7601  7602 -7603  64 -7606 0

c  -2-1 --> break 
c    ( b^{4, 16}_2 ∧  b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨  b^{4, 16}_0 ∨  p_64 ∨ break
c  in DIMACS:
-7601 -7602  7603  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 16}_2 ∧ -b^{4, 16}_1 ∧ -b^{4, 16}_0 ∧ true) 
c  in CNF:
c    -b^{4, 16}_2 ∨  b^{4, 16}_1 ∨  b^{4, 16}_0 ∨ false 
c  in DIMACS:
-7601  7602  7603  0

c  3 does not represent an automaton state.
c    -(-b^{4, 16}_2 ∧  b^{4, 16}_1 ∧  b^{4, 16}_0 ∧ true) 
c  in CNF:
c     b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ false 
c  in DIMACS:
 7601 -7602 -7603  0
c  -3 does not represent an automaton state.
c    -( b^{4, 16}_2 ∧  b^{4, 16}_1 ∧  b^{4, 16}_0 ∧ true) 
c  in CNF:
c    -b^{4, 16}_2 ∨ -b^{4, 16}_1 ∨ -b^{4, 16}_0 ∨ false 
c  in DIMACS:
-7601 -7602 -7603  0

c i = 17
c  -2+1 --> -1
c    ( b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧  p_68) -> ( b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0)
c  in CNF:
c    -b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨  b^{4, 18}_2
c    -b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_1
c    -b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨  b^{4, 18}_0
c  in DIMACS:
-7604 -7605  7606 -68  7607 0
-7604 -7605  7606 -68 -7608 0
-7604 -7605  7606 -68  7609 0

c  -1+1 --> 0
c    ( b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0 ∧  p_68) -> (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧ -b^{4, 18}_0)
c  in CNF:
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_2
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_1
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_0
c  in DIMACS:
-7604  7605 -7606 -68 -7607 0
-7604  7605 -7606 -68 -7608 0
-7604  7605 -7606 -68 -7609 0

c  0+1 --> 1
c    (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧  p_68) -> (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0)
c  in CNF:
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_2
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_1
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨  b^{4, 18}_0
c  in DIMACS:
 7604  7605  7606 -68 -7607 0
 7604  7605  7606 -68 -7608 0
 7604  7605  7606 -68  7609 0

c  1+1 --> 2
c    (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0 ∧  p_68) -> (-b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0)
c  in CNF:
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_2
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨  b^{4, 18}_1
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ -p_68 ∨ -b^{4, 18}_0
c  in DIMACS:
 7604  7605 -7606 -68 -7607 0
 7604  7605 -7606 -68  7608 0
 7604  7605 -7606 -68 -7609 0

c  2+1 --> break 
c    (-b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧  p_68) -> break
c  in CNF:
c     b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 7604 -7605  7606 -68 1162 0


c  2-1 --> 1
c    (-b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧ -p_68) -> (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0)
c  in CNF:
c     b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_2
c     b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_1
c     b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨  b^{4, 18}_0
c  in DIMACS:
 7604 -7605  7606  68 -7607 0
 7604 -7605  7606  68 -7608 0
 7604 -7605  7606  68  7609 0

c  1-1 --> 0
c    (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0 ∧ -p_68) -> (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧ -b^{4, 18}_0)
c  in CNF:
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_2
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_1
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_0
c  in DIMACS:
 7604  7605 -7606  68 -7607 0
 7604  7605 -7606  68 -7608 0
 7604  7605 -7606  68 -7609 0

c  0-1 --> -1
c    (-b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧ -p_68) -> ( b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0)
c  in CNF:
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨  b^{4, 18}_2
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_1
c     b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨  b^{4, 18}_0
c  in DIMACS:
 7604  7605  7606  68  7607 0
 7604  7605  7606  68 -7608 0
 7604  7605  7606  68  7609 0

c  -1-1 --> -2
c    ( b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧  b^{4, 17}_0 ∧ -p_68) -> ( b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0)
c  in CNF:
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨  b^{4, 18}_2
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨  b^{4, 18}_1
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨  p_68 ∨ -b^{4, 18}_0
c  in DIMACS:
-7604  7605 -7606  68  7607 0
-7604  7605 -7606  68  7608 0
-7604  7605 -7606  68 -7609 0

c  -2-1 --> break 
c    ( b^{4, 17}_2 ∧  b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨  b^{4, 17}_0 ∨  p_68 ∨ break
c  in DIMACS:
-7604 -7605  7606  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 17}_2 ∧ -b^{4, 17}_1 ∧ -b^{4, 17}_0 ∧ true) 
c  in CNF:
c    -b^{4, 17}_2 ∨  b^{4, 17}_1 ∨  b^{4, 17}_0 ∨ false 
c  in DIMACS:
-7604  7605  7606  0

c  3 does not represent an automaton state.
c    -(-b^{4, 17}_2 ∧  b^{4, 17}_1 ∧  b^{4, 17}_0 ∧ true) 
c  in CNF:
c     b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ false 
c  in DIMACS:
 7604 -7605 -7606  0
c  -3 does not represent an automaton state.
c    -( b^{4, 17}_2 ∧  b^{4, 17}_1 ∧  b^{4, 17}_0 ∧ true) 
c  in CNF:
c    -b^{4, 17}_2 ∨ -b^{4, 17}_1 ∨ -b^{4, 17}_0 ∨ false 
c  in DIMACS:
-7604 -7605 -7606  0

c i = 18
c  -2+1 --> -1
c    ( b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧  p_72) -> ( b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0)
c  in CNF:
c    -b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨  b^{4, 19}_2
c    -b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_1
c    -b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨  b^{4, 19}_0
c  in DIMACS:
-7607 -7608  7609 -72  7610 0
-7607 -7608  7609 -72 -7611 0
-7607 -7608  7609 -72  7612 0

c  -1+1 --> 0
c    ( b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0 ∧  p_72) -> (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧ -b^{4, 19}_0)
c  in CNF:
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_2
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_1
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_0
c  in DIMACS:
-7607  7608 -7609 -72 -7610 0
-7607  7608 -7609 -72 -7611 0
-7607  7608 -7609 -72 -7612 0

c  0+1 --> 1
c    (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧  p_72) -> (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0)
c  in CNF:
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_2
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_1
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨  b^{4, 19}_0
c  in DIMACS:
 7607  7608  7609 -72 -7610 0
 7607  7608  7609 -72 -7611 0
 7607  7608  7609 -72  7612 0

c  1+1 --> 2
c    (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0 ∧  p_72) -> (-b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0)
c  in CNF:
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_2
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨  b^{4, 19}_1
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ -p_72 ∨ -b^{4, 19}_0
c  in DIMACS:
 7607  7608 -7609 -72 -7610 0
 7607  7608 -7609 -72  7611 0
 7607  7608 -7609 -72 -7612 0

c  2+1 --> break 
c    (-b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧  p_72) -> break
c  in CNF:
c     b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 7607 -7608  7609 -72 1162 0


c  2-1 --> 1
c    (-b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧ -p_72) -> (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0)
c  in CNF:
c     b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_2
c     b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_1
c     b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨  b^{4, 19}_0
c  in DIMACS:
 7607 -7608  7609  72 -7610 0
 7607 -7608  7609  72 -7611 0
 7607 -7608  7609  72  7612 0

c  1-1 --> 0
c    (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0 ∧ -p_72) -> (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧ -b^{4, 19}_0)
c  in CNF:
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_2
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_1
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_0
c  in DIMACS:
 7607  7608 -7609  72 -7610 0
 7607  7608 -7609  72 -7611 0
 7607  7608 -7609  72 -7612 0

c  0-1 --> -1
c    (-b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧ -p_72) -> ( b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0)
c  in CNF:
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨  b^{4, 19}_2
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_1
c     b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨  b^{4, 19}_0
c  in DIMACS:
 7607  7608  7609  72  7610 0
 7607  7608  7609  72 -7611 0
 7607  7608  7609  72  7612 0

c  -1-1 --> -2
c    ( b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧  b^{4, 18}_0 ∧ -p_72) -> ( b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0)
c  in CNF:
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨  b^{4, 19}_2
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨  b^{4, 19}_1
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨  p_72 ∨ -b^{4, 19}_0
c  in DIMACS:
-7607  7608 -7609  72  7610 0
-7607  7608 -7609  72  7611 0
-7607  7608 -7609  72 -7612 0

c  -2-1 --> break 
c    ( b^{4, 18}_2 ∧  b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨  b^{4, 18}_0 ∨  p_72 ∨ break
c  in DIMACS:
-7607 -7608  7609  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 18}_2 ∧ -b^{4, 18}_1 ∧ -b^{4, 18}_0 ∧ true) 
c  in CNF:
c    -b^{4, 18}_2 ∨  b^{4, 18}_1 ∨  b^{4, 18}_0 ∨ false 
c  in DIMACS:
-7607  7608  7609  0

c  3 does not represent an automaton state.
c    -(-b^{4, 18}_2 ∧  b^{4, 18}_1 ∧  b^{4, 18}_0 ∧ true) 
c  in CNF:
c     b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ false 
c  in DIMACS:
 7607 -7608 -7609  0
c  -3 does not represent an automaton state.
c    -( b^{4, 18}_2 ∧  b^{4, 18}_1 ∧  b^{4, 18}_0 ∧ true) 
c  in CNF:
c    -b^{4, 18}_2 ∨ -b^{4, 18}_1 ∨ -b^{4, 18}_0 ∨ false 
c  in DIMACS:
-7607 -7608 -7609  0

c i = 19
c  -2+1 --> -1
c    ( b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧  p_76) -> ( b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0)
c  in CNF:
c    -b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨  b^{4, 20}_2
c    -b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_1
c    -b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨  b^{4, 20}_0
c  in DIMACS:
-7610 -7611  7612 -76  7613 0
-7610 -7611  7612 -76 -7614 0
-7610 -7611  7612 -76  7615 0

c  -1+1 --> 0
c    ( b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0 ∧  p_76) -> (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧ -b^{4, 20}_0)
c  in CNF:
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_2
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_1
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_0
c  in DIMACS:
-7610  7611 -7612 -76 -7613 0
-7610  7611 -7612 -76 -7614 0
-7610  7611 -7612 -76 -7615 0

c  0+1 --> 1
c    (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧  p_76) -> (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0)
c  in CNF:
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_2
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_1
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨  b^{4, 20}_0
c  in DIMACS:
 7610  7611  7612 -76 -7613 0
 7610  7611  7612 -76 -7614 0
 7610  7611  7612 -76  7615 0

c  1+1 --> 2
c    (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0 ∧  p_76) -> (-b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0)
c  in CNF:
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_2
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨  b^{4, 20}_1
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ -p_76 ∨ -b^{4, 20}_0
c  in DIMACS:
 7610  7611 -7612 -76 -7613 0
 7610  7611 -7612 -76  7614 0
 7610  7611 -7612 -76 -7615 0

c  2+1 --> break 
c    (-b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧  p_76) -> break
c  in CNF:
c     b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 7610 -7611  7612 -76 1162 0


c  2-1 --> 1
c    (-b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧ -p_76) -> (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0)
c  in CNF:
c     b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_2
c     b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_1
c     b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨  b^{4, 20}_0
c  in DIMACS:
 7610 -7611  7612  76 -7613 0
 7610 -7611  7612  76 -7614 0
 7610 -7611  7612  76  7615 0

c  1-1 --> 0
c    (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0 ∧ -p_76) -> (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧ -b^{4, 20}_0)
c  in CNF:
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_2
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_1
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_0
c  in DIMACS:
 7610  7611 -7612  76 -7613 0
 7610  7611 -7612  76 -7614 0
 7610  7611 -7612  76 -7615 0

c  0-1 --> -1
c    (-b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧ -p_76) -> ( b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0)
c  in CNF:
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨  b^{4, 20}_2
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_1
c     b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨  b^{4, 20}_0
c  in DIMACS:
 7610  7611  7612  76  7613 0
 7610  7611  7612  76 -7614 0
 7610  7611  7612  76  7615 0

c  -1-1 --> -2
c    ( b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧  b^{4, 19}_0 ∧ -p_76) -> ( b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0)
c  in CNF:
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨  b^{4, 20}_2
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨  b^{4, 20}_1
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨  p_76 ∨ -b^{4, 20}_0
c  in DIMACS:
-7610  7611 -7612  76  7613 0
-7610  7611 -7612  76  7614 0
-7610  7611 -7612  76 -7615 0

c  -2-1 --> break 
c    ( b^{4, 19}_2 ∧  b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨  b^{4, 19}_0 ∨  p_76 ∨ break
c  in DIMACS:
-7610 -7611  7612  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 19}_2 ∧ -b^{4, 19}_1 ∧ -b^{4, 19}_0 ∧ true) 
c  in CNF:
c    -b^{4, 19}_2 ∨  b^{4, 19}_1 ∨  b^{4, 19}_0 ∨ false 
c  in DIMACS:
-7610  7611  7612  0

c  3 does not represent an automaton state.
c    -(-b^{4, 19}_2 ∧  b^{4, 19}_1 ∧  b^{4, 19}_0 ∧ true) 
c  in CNF:
c     b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ false 
c  in DIMACS:
 7610 -7611 -7612  0
c  -3 does not represent an automaton state.
c    -( b^{4, 19}_2 ∧  b^{4, 19}_1 ∧  b^{4, 19}_0 ∧ true) 
c  in CNF:
c    -b^{4, 19}_2 ∨ -b^{4, 19}_1 ∨ -b^{4, 19}_0 ∨ false 
c  in DIMACS:
-7610 -7611 -7612  0

c i = 20
c  -2+1 --> -1
c    ( b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧  p_80) -> ( b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0)
c  in CNF:
c    -b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨  b^{4, 21}_2
c    -b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_1
c    -b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨  b^{4, 21}_0
c  in DIMACS:
-7613 -7614  7615 -80  7616 0
-7613 -7614  7615 -80 -7617 0
-7613 -7614  7615 -80  7618 0

c  -1+1 --> 0
c    ( b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0 ∧  p_80) -> (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧ -b^{4, 21}_0)
c  in CNF:
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_2
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_1
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_0
c  in DIMACS:
-7613  7614 -7615 -80 -7616 0
-7613  7614 -7615 -80 -7617 0
-7613  7614 -7615 -80 -7618 0

c  0+1 --> 1
c    (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧  p_80) -> (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0)
c  in CNF:
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_2
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_1
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨  b^{4, 21}_0
c  in DIMACS:
 7613  7614  7615 -80 -7616 0
 7613  7614  7615 -80 -7617 0
 7613  7614  7615 -80  7618 0

c  1+1 --> 2
c    (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0 ∧  p_80) -> (-b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0)
c  in CNF:
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_2
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨  b^{4, 21}_1
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ -p_80 ∨ -b^{4, 21}_0
c  in DIMACS:
 7613  7614 -7615 -80 -7616 0
 7613  7614 -7615 -80  7617 0
 7613  7614 -7615 -80 -7618 0

c  2+1 --> break 
c    (-b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧  p_80) -> break
c  in CNF:
c     b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 7613 -7614  7615 -80 1162 0


c  2-1 --> 1
c    (-b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧ -p_80) -> (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0)
c  in CNF:
c     b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_2
c     b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_1
c     b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨  b^{4, 21}_0
c  in DIMACS:
 7613 -7614  7615  80 -7616 0
 7613 -7614  7615  80 -7617 0
 7613 -7614  7615  80  7618 0

c  1-1 --> 0
c    (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0 ∧ -p_80) -> (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧ -b^{4, 21}_0)
c  in CNF:
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_2
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_1
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_0
c  in DIMACS:
 7613  7614 -7615  80 -7616 0
 7613  7614 -7615  80 -7617 0
 7613  7614 -7615  80 -7618 0

c  0-1 --> -1
c    (-b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧ -p_80) -> ( b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0)
c  in CNF:
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨  b^{4, 21}_2
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_1
c     b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨  b^{4, 21}_0
c  in DIMACS:
 7613  7614  7615  80  7616 0
 7613  7614  7615  80 -7617 0
 7613  7614  7615  80  7618 0

c  -1-1 --> -2
c    ( b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧  b^{4, 20}_0 ∧ -p_80) -> ( b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0)
c  in CNF:
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨  b^{4, 21}_2
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨  b^{4, 21}_1
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨  p_80 ∨ -b^{4, 21}_0
c  in DIMACS:
-7613  7614 -7615  80  7616 0
-7613  7614 -7615  80  7617 0
-7613  7614 -7615  80 -7618 0

c  -2-1 --> break 
c    ( b^{4, 20}_2 ∧  b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨  b^{4, 20}_0 ∨  p_80 ∨ break
c  in DIMACS:
-7613 -7614  7615  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 20}_2 ∧ -b^{4, 20}_1 ∧ -b^{4, 20}_0 ∧ true) 
c  in CNF:
c    -b^{4, 20}_2 ∨  b^{4, 20}_1 ∨  b^{4, 20}_0 ∨ false 
c  in DIMACS:
-7613  7614  7615  0

c  3 does not represent an automaton state.
c    -(-b^{4, 20}_2 ∧  b^{4, 20}_1 ∧  b^{4, 20}_0 ∧ true) 
c  in CNF:
c     b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ false 
c  in DIMACS:
 7613 -7614 -7615  0
c  -3 does not represent an automaton state.
c    -( b^{4, 20}_2 ∧  b^{4, 20}_1 ∧  b^{4, 20}_0 ∧ true) 
c  in CNF:
c    -b^{4, 20}_2 ∨ -b^{4, 20}_1 ∨ -b^{4, 20}_0 ∨ false 
c  in DIMACS:
-7613 -7614 -7615  0

c i = 21
c  -2+1 --> -1
c    ( b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧  p_84) -> ( b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0)
c  in CNF:
c    -b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨  b^{4, 22}_2
c    -b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_1
c    -b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨  b^{4, 22}_0
c  in DIMACS:
-7616 -7617  7618 -84  7619 0
-7616 -7617  7618 -84 -7620 0
-7616 -7617  7618 -84  7621 0

c  -1+1 --> 0
c    ( b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0 ∧  p_84) -> (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧ -b^{4, 22}_0)
c  in CNF:
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_2
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_1
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_0
c  in DIMACS:
-7616  7617 -7618 -84 -7619 0
-7616  7617 -7618 -84 -7620 0
-7616  7617 -7618 -84 -7621 0

c  0+1 --> 1
c    (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧  p_84) -> (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0)
c  in CNF:
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_2
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_1
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨  b^{4, 22}_0
c  in DIMACS:
 7616  7617  7618 -84 -7619 0
 7616  7617  7618 -84 -7620 0
 7616  7617  7618 -84  7621 0

c  1+1 --> 2
c    (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0 ∧  p_84) -> (-b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0)
c  in CNF:
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_2
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨  b^{4, 22}_1
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ -p_84 ∨ -b^{4, 22}_0
c  in DIMACS:
 7616  7617 -7618 -84 -7619 0
 7616  7617 -7618 -84  7620 0
 7616  7617 -7618 -84 -7621 0

c  2+1 --> break 
c    (-b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧  p_84) -> break
c  in CNF:
c     b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 7616 -7617  7618 -84 1162 0


c  2-1 --> 1
c    (-b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧ -p_84) -> (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0)
c  in CNF:
c     b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_2
c     b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_1
c     b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨  b^{4, 22}_0
c  in DIMACS:
 7616 -7617  7618  84 -7619 0
 7616 -7617  7618  84 -7620 0
 7616 -7617  7618  84  7621 0

c  1-1 --> 0
c    (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0 ∧ -p_84) -> (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧ -b^{4, 22}_0)
c  in CNF:
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_2
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_1
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_0
c  in DIMACS:
 7616  7617 -7618  84 -7619 0
 7616  7617 -7618  84 -7620 0
 7616  7617 -7618  84 -7621 0

c  0-1 --> -1
c    (-b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧ -p_84) -> ( b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0)
c  in CNF:
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨  b^{4, 22}_2
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_1
c     b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨  b^{4, 22}_0
c  in DIMACS:
 7616  7617  7618  84  7619 0
 7616  7617  7618  84 -7620 0
 7616  7617  7618  84  7621 0

c  -1-1 --> -2
c    ( b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧  b^{4, 21}_0 ∧ -p_84) -> ( b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0)
c  in CNF:
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨  b^{4, 22}_2
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨  b^{4, 22}_1
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨  p_84 ∨ -b^{4, 22}_0
c  in DIMACS:
-7616  7617 -7618  84  7619 0
-7616  7617 -7618  84  7620 0
-7616  7617 -7618  84 -7621 0

c  -2-1 --> break 
c    ( b^{4, 21}_2 ∧  b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨  b^{4, 21}_0 ∨  p_84 ∨ break
c  in DIMACS:
-7616 -7617  7618  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 21}_2 ∧ -b^{4, 21}_1 ∧ -b^{4, 21}_0 ∧ true) 
c  in CNF:
c    -b^{4, 21}_2 ∨  b^{4, 21}_1 ∨  b^{4, 21}_0 ∨ false 
c  in DIMACS:
-7616  7617  7618  0

c  3 does not represent an automaton state.
c    -(-b^{4, 21}_2 ∧  b^{4, 21}_1 ∧  b^{4, 21}_0 ∧ true) 
c  in CNF:
c     b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ false 
c  in DIMACS:
 7616 -7617 -7618  0
c  -3 does not represent an automaton state.
c    -( b^{4, 21}_2 ∧  b^{4, 21}_1 ∧  b^{4, 21}_0 ∧ true) 
c  in CNF:
c    -b^{4, 21}_2 ∨ -b^{4, 21}_1 ∨ -b^{4, 21}_0 ∨ false 
c  in DIMACS:
-7616 -7617 -7618  0

c i = 22
c  -2+1 --> -1
c    ( b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧  p_88) -> ( b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0)
c  in CNF:
c    -b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨  b^{4, 23}_2
c    -b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_1
c    -b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨  b^{4, 23}_0
c  in DIMACS:
-7619 -7620  7621 -88  7622 0
-7619 -7620  7621 -88 -7623 0
-7619 -7620  7621 -88  7624 0

c  -1+1 --> 0
c    ( b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0 ∧  p_88) -> (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧ -b^{4, 23}_0)
c  in CNF:
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_2
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_1
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_0
c  in DIMACS:
-7619  7620 -7621 -88 -7622 0
-7619  7620 -7621 -88 -7623 0
-7619  7620 -7621 -88 -7624 0

c  0+1 --> 1
c    (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧  p_88) -> (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0)
c  in CNF:
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_2
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_1
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨  b^{4, 23}_0
c  in DIMACS:
 7619  7620  7621 -88 -7622 0
 7619  7620  7621 -88 -7623 0
 7619  7620  7621 -88  7624 0

c  1+1 --> 2
c    (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0 ∧  p_88) -> (-b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0)
c  in CNF:
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_2
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨  b^{4, 23}_1
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ -p_88 ∨ -b^{4, 23}_0
c  in DIMACS:
 7619  7620 -7621 -88 -7622 0
 7619  7620 -7621 -88  7623 0
 7619  7620 -7621 -88 -7624 0

c  2+1 --> break 
c    (-b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧  p_88) -> break
c  in CNF:
c     b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 7619 -7620  7621 -88 1162 0


c  2-1 --> 1
c    (-b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧ -p_88) -> (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0)
c  in CNF:
c     b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_2
c     b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_1
c     b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨  b^{4, 23}_0
c  in DIMACS:
 7619 -7620  7621  88 -7622 0
 7619 -7620  7621  88 -7623 0
 7619 -7620  7621  88  7624 0

c  1-1 --> 0
c    (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0 ∧ -p_88) -> (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧ -b^{4, 23}_0)
c  in CNF:
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_2
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_1
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_0
c  in DIMACS:
 7619  7620 -7621  88 -7622 0
 7619  7620 -7621  88 -7623 0
 7619  7620 -7621  88 -7624 0

c  0-1 --> -1
c    (-b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧ -p_88) -> ( b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0)
c  in CNF:
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨  b^{4, 23}_2
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_1
c     b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨  b^{4, 23}_0
c  in DIMACS:
 7619  7620  7621  88  7622 0
 7619  7620  7621  88 -7623 0
 7619  7620  7621  88  7624 0

c  -1-1 --> -2
c    ( b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧  b^{4, 22}_0 ∧ -p_88) -> ( b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0)
c  in CNF:
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨  b^{4, 23}_2
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨  b^{4, 23}_1
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨  p_88 ∨ -b^{4, 23}_0
c  in DIMACS:
-7619  7620 -7621  88  7622 0
-7619  7620 -7621  88  7623 0
-7619  7620 -7621  88 -7624 0

c  -2-1 --> break 
c    ( b^{4, 22}_2 ∧  b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨  b^{4, 22}_0 ∨  p_88 ∨ break
c  in DIMACS:
-7619 -7620  7621  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 22}_2 ∧ -b^{4, 22}_1 ∧ -b^{4, 22}_0 ∧ true) 
c  in CNF:
c    -b^{4, 22}_2 ∨  b^{4, 22}_1 ∨  b^{4, 22}_0 ∨ false 
c  in DIMACS:
-7619  7620  7621  0

c  3 does not represent an automaton state.
c    -(-b^{4, 22}_2 ∧  b^{4, 22}_1 ∧  b^{4, 22}_0 ∧ true) 
c  in CNF:
c     b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ false 
c  in DIMACS:
 7619 -7620 -7621  0
c  -3 does not represent an automaton state.
c    -( b^{4, 22}_2 ∧  b^{4, 22}_1 ∧  b^{4, 22}_0 ∧ true) 
c  in CNF:
c    -b^{4, 22}_2 ∨ -b^{4, 22}_1 ∨ -b^{4, 22}_0 ∨ false 
c  in DIMACS:
-7619 -7620 -7621  0

c i = 23
c  -2+1 --> -1
c    ( b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧  p_92) -> ( b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0)
c  in CNF:
c    -b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨  b^{4, 24}_2
c    -b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_1
c    -b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨  b^{4, 24}_0
c  in DIMACS:
-7622 -7623  7624 -92  7625 0
-7622 -7623  7624 -92 -7626 0
-7622 -7623  7624 -92  7627 0

c  -1+1 --> 0
c    ( b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0 ∧  p_92) -> (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧ -b^{4, 24}_0)
c  in CNF:
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_2
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_1
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_0
c  in DIMACS:
-7622  7623 -7624 -92 -7625 0
-7622  7623 -7624 -92 -7626 0
-7622  7623 -7624 -92 -7627 0

c  0+1 --> 1
c    (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧  p_92) -> (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0)
c  in CNF:
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_2
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_1
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨  b^{4, 24}_0
c  in DIMACS:
 7622  7623  7624 -92 -7625 0
 7622  7623  7624 -92 -7626 0
 7622  7623  7624 -92  7627 0

c  1+1 --> 2
c    (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0 ∧  p_92) -> (-b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0)
c  in CNF:
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_2
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨  b^{4, 24}_1
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ -p_92 ∨ -b^{4, 24}_0
c  in DIMACS:
 7622  7623 -7624 -92 -7625 0
 7622  7623 -7624 -92  7626 0
 7622  7623 -7624 -92 -7627 0

c  2+1 --> break 
c    (-b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧  p_92) -> break
c  in CNF:
c     b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 7622 -7623  7624 -92 1162 0


c  2-1 --> 1
c    (-b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧ -p_92) -> (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0)
c  in CNF:
c     b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_2
c     b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_1
c     b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨  b^{4, 24}_0
c  in DIMACS:
 7622 -7623  7624  92 -7625 0
 7622 -7623  7624  92 -7626 0
 7622 -7623  7624  92  7627 0

c  1-1 --> 0
c    (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0 ∧ -p_92) -> (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧ -b^{4, 24}_0)
c  in CNF:
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_2
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_1
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_0
c  in DIMACS:
 7622  7623 -7624  92 -7625 0
 7622  7623 -7624  92 -7626 0
 7622  7623 -7624  92 -7627 0

c  0-1 --> -1
c    (-b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧ -p_92) -> ( b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0)
c  in CNF:
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨  b^{4, 24}_2
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_1
c     b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨  b^{4, 24}_0
c  in DIMACS:
 7622  7623  7624  92  7625 0
 7622  7623  7624  92 -7626 0
 7622  7623  7624  92  7627 0

c  -1-1 --> -2
c    ( b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧  b^{4, 23}_0 ∧ -p_92) -> ( b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0)
c  in CNF:
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨  b^{4, 24}_2
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨  b^{4, 24}_1
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨  p_92 ∨ -b^{4, 24}_0
c  in DIMACS:
-7622  7623 -7624  92  7625 0
-7622  7623 -7624  92  7626 0
-7622  7623 -7624  92 -7627 0

c  -2-1 --> break 
c    ( b^{4, 23}_2 ∧  b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨  b^{4, 23}_0 ∨  p_92 ∨ break
c  in DIMACS:
-7622 -7623  7624  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 23}_2 ∧ -b^{4, 23}_1 ∧ -b^{4, 23}_0 ∧ true) 
c  in CNF:
c    -b^{4, 23}_2 ∨  b^{4, 23}_1 ∨  b^{4, 23}_0 ∨ false 
c  in DIMACS:
-7622  7623  7624  0

c  3 does not represent an automaton state.
c    -(-b^{4, 23}_2 ∧  b^{4, 23}_1 ∧  b^{4, 23}_0 ∧ true) 
c  in CNF:
c     b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ false 
c  in DIMACS:
 7622 -7623 -7624  0
c  -3 does not represent an automaton state.
c    -( b^{4, 23}_2 ∧  b^{4, 23}_1 ∧  b^{4, 23}_0 ∧ true) 
c  in CNF:
c    -b^{4, 23}_2 ∨ -b^{4, 23}_1 ∨ -b^{4, 23}_0 ∨ false 
c  in DIMACS:
-7622 -7623 -7624  0

c i = 24
c  -2+1 --> -1
c    ( b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧  p_96) -> ( b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0)
c  in CNF:
c    -b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨  b^{4, 25}_2
c    -b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_1
c    -b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨  b^{4, 25}_0
c  in DIMACS:
-7625 -7626  7627 -96  7628 0
-7625 -7626  7627 -96 -7629 0
-7625 -7626  7627 -96  7630 0

c  -1+1 --> 0
c    ( b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0 ∧  p_96) -> (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧ -b^{4, 25}_0)
c  in CNF:
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_2
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_1
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_0
c  in DIMACS:
-7625  7626 -7627 -96 -7628 0
-7625  7626 -7627 -96 -7629 0
-7625  7626 -7627 -96 -7630 0

c  0+1 --> 1
c    (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧  p_96) -> (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0)
c  in CNF:
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_2
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_1
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨  b^{4, 25}_0
c  in DIMACS:
 7625  7626  7627 -96 -7628 0
 7625  7626  7627 -96 -7629 0
 7625  7626  7627 -96  7630 0

c  1+1 --> 2
c    (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0 ∧  p_96) -> (-b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0)
c  in CNF:
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_2
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨  b^{4, 25}_1
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ -p_96 ∨ -b^{4, 25}_0
c  in DIMACS:
 7625  7626 -7627 -96 -7628 0
 7625  7626 -7627 -96  7629 0
 7625  7626 -7627 -96 -7630 0

c  2+1 --> break 
c    (-b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧  p_96) -> break
c  in CNF:
c     b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 7625 -7626  7627 -96 1162 0


c  2-1 --> 1
c    (-b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧ -p_96) -> (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0)
c  in CNF:
c     b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_2
c     b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_1
c     b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨  b^{4, 25}_0
c  in DIMACS:
 7625 -7626  7627  96 -7628 0
 7625 -7626  7627  96 -7629 0
 7625 -7626  7627  96  7630 0

c  1-1 --> 0
c    (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0 ∧ -p_96) -> (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧ -b^{4, 25}_0)
c  in CNF:
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_2
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_1
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_0
c  in DIMACS:
 7625  7626 -7627  96 -7628 0
 7625  7626 -7627  96 -7629 0
 7625  7626 -7627  96 -7630 0

c  0-1 --> -1
c    (-b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧ -p_96) -> ( b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0)
c  in CNF:
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨  b^{4, 25}_2
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_1
c     b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨  b^{4, 25}_0
c  in DIMACS:
 7625  7626  7627  96  7628 0
 7625  7626  7627  96 -7629 0
 7625  7626  7627  96  7630 0

c  -1-1 --> -2
c    ( b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧  b^{4, 24}_0 ∧ -p_96) -> ( b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0)
c  in CNF:
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨  b^{4, 25}_2
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨  b^{4, 25}_1
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨  p_96 ∨ -b^{4, 25}_0
c  in DIMACS:
-7625  7626 -7627  96  7628 0
-7625  7626 -7627  96  7629 0
-7625  7626 -7627  96 -7630 0

c  -2-1 --> break 
c    ( b^{4, 24}_2 ∧  b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨  b^{4, 24}_0 ∨  p_96 ∨ break
c  in DIMACS:
-7625 -7626  7627  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 24}_2 ∧ -b^{4, 24}_1 ∧ -b^{4, 24}_0 ∧ true) 
c  in CNF:
c    -b^{4, 24}_2 ∨  b^{4, 24}_1 ∨  b^{4, 24}_0 ∨ false 
c  in DIMACS:
-7625  7626  7627  0

c  3 does not represent an automaton state.
c    -(-b^{4, 24}_2 ∧  b^{4, 24}_1 ∧  b^{4, 24}_0 ∧ true) 
c  in CNF:
c     b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ false 
c  in DIMACS:
 7625 -7626 -7627  0
c  -3 does not represent an automaton state.
c    -( b^{4, 24}_2 ∧  b^{4, 24}_1 ∧  b^{4, 24}_0 ∧ true) 
c  in CNF:
c    -b^{4, 24}_2 ∨ -b^{4, 24}_1 ∨ -b^{4, 24}_0 ∨ false 
c  in DIMACS:
-7625 -7626 -7627  0

c i = 25
c  -2+1 --> -1
c    ( b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧  p_100) -> ( b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0)
c  in CNF:
c    -b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨  b^{4, 26}_2
c    -b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_1
c    -b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨  b^{4, 26}_0
c  in DIMACS:
-7628 -7629  7630 -100  7631 0
-7628 -7629  7630 -100 -7632 0
-7628 -7629  7630 -100  7633 0

c  -1+1 --> 0
c    ( b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0 ∧  p_100) -> (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧ -b^{4, 26}_0)
c  in CNF:
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_2
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_1
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_0
c  in DIMACS:
-7628  7629 -7630 -100 -7631 0
-7628  7629 -7630 -100 -7632 0
-7628  7629 -7630 -100 -7633 0

c  0+1 --> 1
c    (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧  p_100) -> (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0)
c  in CNF:
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_2
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_1
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨  b^{4, 26}_0
c  in DIMACS:
 7628  7629  7630 -100 -7631 0
 7628  7629  7630 -100 -7632 0
 7628  7629  7630 -100  7633 0

c  1+1 --> 2
c    (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0 ∧  p_100) -> (-b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0)
c  in CNF:
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_2
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨  b^{4, 26}_1
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ -p_100 ∨ -b^{4, 26}_0
c  in DIMACS:
 7628  7629 -7630 -100 -7631 0
 7628  7629 -7630 -100  7632 0
 7628  7629 -7630 -100 -7633 0

c  2+1 --> break 
c    (-b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧  p_100) -> break
c  in CNF:
c     b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 7628 -7629  7630 -100 1162 0


c  2-1 --> 1
c    (-b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧ -p_100) -> (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0)
c  in CNF:
c     b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_2
c     b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_1
c     b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨  b^{4, 26}_0
c  in DIMACS:
 7628 -7629  7630  100 -7631 0
 7628 -7629  7630  100 -7632 0
 7628 -7629  7630  100  7633 0

c  1-1 --> 0
c    (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0 ∧ -p_100) -> (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧ -b^{4, 26}_0)
c  in CNF:
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_2
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_1
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_0
c  in DIMACS:
 7628  7629 -7630  100 -7631 0
 7628  7629 -7630  100 -7632 0
 7628  7629 -7630  100 -7633 0

c  0-1 --> -1
c    (-b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧ -p_100) -> ( b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0)
c  in CNF:
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨  b^{4, 26}_2
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_1
c     b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨  b^{4, 26}_0
c  in DIMACS:
 7628  7629  7630  100  7631 0
 7628  7629  7630  100 -7632 0
 7628  7629  7630  100  7633 0

c  -1-1 --> -2
c    ( b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧  b^{4, 25}_0 ∧ -p_100) -> ( b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0)
c  in CNF:
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨  b^{4, 26}_2
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨  b^{4, 26}_1
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨  p_100 ∨ -b^{4, 26}_0
c  in DIMACS:
-7628  7629 -7630  100  7631 0
-7628  7629 -7630  100  7632 0
-7628  7629 -7630  100 -7633 0

c  -2-1 --> break 
c    ( b^{4, 25}_2 ∧  b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨  b^{4, 25}_0 ∨  p_100 ∨ break
c  in DIMACS:
-7628 -7629  7630  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 25}_2 ∧ -b^{4, 25}_1 ∧ -b^{4, 25}_0 ∧ true) 
c  in CNF:
c    -b^{4, 25}_2 ∨  b^{4, 25}_1 ∨  b^{4, 25}_0 ∨ false 
c  in DIMACS:
-7628  7629  7630  0

c  3 does not represent an automaton state.
c    -(-b^{4, 25}_2 ∧  b^{4, 25}_1 ∧  b^{4, 25}_0 ∧ true) 
c  in CNF:
c     b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ false 
c  in DIMACS:
 7628 -7629 -7630  0
c  -3 does not represent an automaton state.
c    -( b^{4, 25}_2 ∧  b^{4, 25}_1 ∧  b^{4, 25}_0 ∧ true) 
c  in CNF:
c    -b^{4, 25}_2 ∨ -b^{4, 25}_1 ∨ -b^{4, 25}_0 ∨ false 
c  in DIMACS:
-7628 -7629 -7630  0

c i = 26
c  -2+1 --> -1
c    ( b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧  p_104) -> ( b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0)
c  in CNF:
c    -b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨  b^{4, 27}_2
c    -b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_1
c    -b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨  b^{4, 27}_0
c  in DIMACS:
-7631 -7632  7633 -104  7634 0
-7631 -7632  7633 -104 -7635 0
-7631 -7632  7633 -104  7636 0

c  -1+1 --> 0
c    ( b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0 ∧  p_104) -> (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧ -b^{4, 27}_0)
c  in CNF:
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_2
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_1
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_0
c  in DIMACS:
-7631  7632 -7633 -104 -7634 0
-7631  7632 -7633 -104 -7635 0
-7631  7632 -7633 -104 -7636 0

c  0+1 --> 1
c    (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧  p_104) -> (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0)
c  in CNF:
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_2
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_1
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨  b^{4, 27}_0
c  in DIMACS:
 7631  7632  7633 -104 -7634 0
 7631  7632  7633 -104 -7635 0
 7631  7632  7633 -104  7636 0

c  1+1 --> 2
c    (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0 ∧  p_104) -> (-b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0)
c  in CNF:
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_2
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨  b^{4, 27}_1
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ -p_104 ∨ -b^{4, 27}_0
c  in DIMACS:
 7631  7632 -7633 -104 -7634 0
 7631  7632 -7633 -104  7635 0
 7631  7632 -7633 -104 -7636 0

c  2+1 --> break 
c    (-b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧  p_104) -> break
c  in CNF:
c     b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 7631 -7632  7633 -104 1162 0


c  2-1 --> 1
c    (-b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧ -p_104) -> (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0)
c  in CNF:
c     b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_2
c     b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_1
c     b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨  b^{4, 27}_0
c  in DIMACS:
 7631 -7632  7633  104 -7634 0
 7631 -7632  7633  104 -7635 0
 7631 -7632  7633  104  7636 0

c  1-1 --> 0
c    (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0 ∧ -p_104) -> (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧ -b^{4, 27}_0)
c  in CNF:
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_2
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_1
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_0
c  in DIMACS:
 7631  7632 -7633  104 -7634 0
 7631  7632 -7633  104 -7635 0
 7631  7632 -7633  104 -7636 0

c  0-1 --> -1
c    (-b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧ -p_104) -> ( b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0)
c  in CNF:
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨  b^{4, 27}_2
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_1
c     b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨  b^{4, 27}_0
c  in DIMACS:
 7631  7632  7633  104  7634 0
 7631  7632  7633  104 -7635 0
 7631  7632  7633  104  7636 0

c  -1-1 --> -2
c    ( b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧  b^{4, 26}_0 ∧ -p_104) -> ( b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0)
c  in CNF:
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨  b^{4, 27}_2
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨  b^{4, 27}_1
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨  p_104 ∨ -b^{4, 27}_0
c  in DIMACS:
-7631  7632 -7633  104  7634 0
-7631  7632 -7633  104  7635 0
-7631  7632 -7633  104 -7636 0

c  -2-1 --> break 
c    ( b^{4, 26}_2 ∧  b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨  b^{4, 26}_0 ∨  p_104 ∨ break
c  in DIMACS:
-7631 -7632  7633  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 26}_2 ∧ -b^{4, 26}_1 ∧ -b^{4, 26}_0 ∧ true) 
c  in CNF:
c    -b^{4, 26}_2 ∨  b^{4, 26}_1 ∨  b^{4, 26}_0 ∨ false 
c  in DIMACS:
-7631  7632  7633  0

c  3 does not represent an automaton state.
c    -(-b^{4, 26}_2 ∧  b^{4, 26}_1 ∧  b^{4, 26}_0 ∧ true) 
c  in CNF:
c     b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ false 
c  in DIMACS:
 7631 -7632 -7633  0
c  -3 does not represent an automaton state.
c    -( b^{4, 26}_2 ∧  b^{4, 26}_1 ∧  b^{4, 26}_0 ∧ true) 
c  in CNF:
c    -b^{4, 26}_2 ∨ -b^{4, 26}_1 ∨ -b^{4, 26}_0 ∨ false 
c  in DIMACS:
-7631 -7632 -7633  0

c i = 27
c  -2+1 --> -1
c    ( b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧  p_108) -> ( b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0)
c  in CNF:
c    -b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨  b^{4, 28}_2
c    -b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_1
c    -b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨  b^{4, 28}_0
c  in DIMACS:
-7634 -7635  7636 -108  7637 0
-7634 -7635  7636 -108 -7638 0
-7634 -7635  7636 -108  7639 0

c  -1+1 --> 0
c    ( b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0 ∧  p_108) -> (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧ -b^{4, 28}_0)
c  in CNF:
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_2
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_1
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_0
c  in DIMACS:
-7634  7635 -7636 -108 -7637 0
-7634  7635 -7636 -108 -7638 0
-7634  7635 -7636 -108 -7639 0

c  0+1 --> 1
c    (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧  p_108) -> (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0)
c  in CNF:
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_2
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_1
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨  b^{4, 28}_0
c  in DIMACS:
 7634  7635  7636 -108 -7637 0
 7634  7635  7636 -108 -7638 0
 7634  7635  7636 -108  7639 0

c  1+1 --> 2
c    (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0 ∧  p_108) -> (-b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0)
c  in CNF:
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_2
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨  b^{4, 28}_1
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ -p_108 ∨ -b^{4, 28}_0
c  in DIMACS:
 7634  7635 -7636 -108 -7637 0
 7634  7635 -7636 -108  7638 0
 7634  7635 -7636 -108 -7639 0

c  2+1 --> break 
c    (-b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧  p_108) -> break
c  in CNF:
c     b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 7634 -7635  7636 -108 1162 0


c  2-1 --> 1
c    (-b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧ -p_108) -> (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0)
c  in CNF:
c     b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_2
c     b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_1
c     b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨  b^{4, 28}_0
c  in DIMACS:
 7634 -7635  7636  108 -7637 0
 7634 -7635  7636  108 -7638 0
 7634 -7635  7636  108  7639 0

c  1-1 --> 0
c    (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0 ∧ -p_108) -> (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧ -b^{4, 28}_0)
c  in CNF:
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_2
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_1
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_0
c  in DIMACS:
 7634  7635 -7636  108 -7637 0
 7634  7635 -7636  108 -7638 0
 7634  7635 -7636  108 -7639 0

c  0-1 --> -1
c    (-b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧ -p_108) -> ( b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0)
c  in CNF:
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨  b^{4, 28}_2
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_1
c     b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨  b^{4, 28}_0
c  in DIMACS:
 7634  7635  7636  108  7637 0
 7634  7635  7636  108 -7638 0
 7634  7635  7636  108  7639 0

c  -1-1 --> -2
c    ( b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧  b^{4, 27}_0 ∧ -p_108) -> ( b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0)
c  in CNF:
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨  b^{4, 28}_2
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨  b^{4, 28}_1
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨  p_108 ∨ -b^{4, 28}_0
c  in DIMACS:
-7634  7635 -7636  108  7637 0
-7634  7635 -7636  108  7638 0
-7634  7635 -7636  108 -7639 0

c  -2-1 --> break 
c    ( b^{4, 27}_2 ∧  b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨  b^{4, 27}_0 ∨  p_108 ∨ break
c  in DIMACS:
-7634 -7635  7636  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 27}_2 ∧ -b^{4, 27}_1 ∧ -b^{4, 27}_0 ∧ true) 
c  in CNF:
c    -b^{4, 27}_2 ∨  b^{4, 27}_1 ∨  b^{4, 27}_0 ∨ false 
c  in DIMACS:
-7634  7635  7636  0

c  3 does not represent an automaton state.
c    -(-b^{4, 27}_2 ∧  b^{4, 27}_1 ∧  b^{4, 27}_0 ∧ true) 
c  in CNF:
c     b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ false 
c  in DIMACS:
 7634 -7635 -7636  0
c  -3 does not represent an automaton state.
c    -( b^{4, 27}_2 ∧  b^{4, 27}_1 ∧  b^{4, 27}_0 ∧ true) 
c  in CNF:
c    -b^{4, 27}_2 ∨ -b^{4, 27}_1 ∨ -b^{4, 27}_0 ∨ false 
c  in DIMACS:
-7634 -7635 -7636  0

c i = 28
c  -2+1 --> -1
c    ( b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧  p_112) -> ( b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0)
c  in CNF:
c    -b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨  b^{4, 29}_2
c    -b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_1
c    -b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨  b^{4, 29}_0
c  in DIMACS:
-7637 -7638  7639 -112  7640 0
-7637 -7638  7639 -112 -7641 0
-7637 -7638  7639 -112  7642 0

c  -1+1 --> 0
c    ( b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0 ∧  p_112) -> (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧ -b^{4, 29}_0)
c  in CNF:
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_2
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_1
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_0
c  in DIMACS:
-7637  7638 -7639 -112 -7640 0
-7637  7638 -7639 -112 -7641 0
-7637  7638 -7639 -112 -7642 0

c  0+1 --> 1
c    (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧  p_112) -> (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0)
c  in CNF:
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_2
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_1
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨  b^{4, 29}_0
c  in DIMACS:
 7637  7638  7639 -112 -7640 0
 7637  7638  7639 -112 -7641 0
 7637  7638  7639 -112  7642 0

c  1+1 --> 2
c    (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0 ∧  p_112) -> (-b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0)
c  in CNF:
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_2
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨  b^{4, 29}_1
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ -p_112 ∨ -b^{4, 29}_0
c  in DIMACS:
 7637  7638 -7639 -112 -7640 0
 7637  7638 -7639 -112  7641 0
 7637  7638 -7639 -112 -7642 0

c  2+1 --> break 
c    (-b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧  p_112) -> break
c  in CNF:
c     b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 7637 -7638  7639 -112 1162 0


c  2-1 --> 1
c    (-b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧ -p_112) -> (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0)
c  in CNF:
c     b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_2
c     b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_1
c     b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨  b^{4, 29}_0
c  in DIMACS:
 7637 -7638  7639  112 -7640 0
 7637 -7638  7639  112 -7641 0
 7637 -7638  7639  112  7642 0

c  1-1 --> 0
c    (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0 ∧ -p_112) -> (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧ -b^{4, 29}_0)
c  in CNF:
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_2
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_1
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_0
c  in DIMACS:
 7637  7638 -7639  112 -7640 0
 7637  7638 -7639  112 -7641 0
 7637  7638 -7639  112 -7642 0

c  0-1 --> -1
c    (-b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧ -p_112) -> ( b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0)
c  in CNF:
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨  b^{4, 29}_2
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_1
c     b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨  b^{4, 29}_0
c  in DIMACS:
 7637  7638  7639  112  7640 0
 7637  7638  7639  112 -7641 0
 7637  7638  7639  112  7642 0

c  -1-1 --> -2
c    ( b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧  b^{4, 28}_0 ∧ -p_112) -> ( b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0)
c  in CNF:
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨  b^{4, 29}_2
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨  b^{4, 29}_1
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨  p_112 ∨ -b^{4, 29}_0
c  in DIMACS:
-7637  7638 -7639  112  7640 0
-7637  7638 -7639  112  7641 0
-7637  7638 -7639  112 -7642 0

c  -2-1 --> break 
c    ( b^{4, 28}_2 ∧  b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨  b^{4, 28}_0 ∨  p_112 ∨ break
c  in DIMACS:
-7637 -7638  7639  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 28}_2 ∧ -b^{4, 28}_1 ∧ -b^{4, 28}_0 ∧ true) 
c  in CNF:
c    -b^{4, 28}_2 ∨  b^{4, 28}_1 ∨  b^{4, 28}_0 ∨ false 
c  in DIMACS:
-7637  7638  7639  0

c  3 does not represent an automaton state.
c    -(-b^{4, 28}_2 ∧  b^{4, 28}_1 ∧  b^{4, 28}_0 ∧ true) 
c  in CNF:
c     b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ false 
c  in DIMACS:
 7637 -7638 -7639  0
c  -3 does not represent an automaton state.
c    -( b^{4, 28}_2 ∧  b^{4, 28}_1 ∧  b^{4, 28}_0 ∧ true) 
c  in CNF:
c    -b^{4, 28}_2 ∨ -b^{4, 28}_1 ∨ -b^{4, 28}_0 ∨ false 
c  in DIMACS:
-7637 -7638 -7639  0

c i = 29
c  -2+1 --> -1
c    ( b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧  p_116) -> ( b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0)
c  in CNF:
c    -b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨  b^{4, 30}_2
c    -b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_1
c    -b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨  b^{4, 30}_0
c  in DIMACS:
-7640 -7641  7642 -116  7643 0
-7640 -7641  7642 -116 -7644 0
-7640 -7641  7642 -116  7645 0

c  -1+1 --> 0
c    ( b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0 ∧  p_116) -> (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧ -b^{4, 30}_0)
c  in CNF:
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_2
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_1
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_0
c  in DIMACS:
-7640  7641 -7642 -116 -7643 0
-7640  7641 -7642 -116 -7644 0
-7640  7641 -7642 -116 -7645 0

c  0+1 --> 1
c    (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧  p_116) -> (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0)
c  in CNF:
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_2
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_1
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨  b^{4, 30}_0
c  in DIMACS:
 7640  7641  7642 -116 -7643 0
 7640  7641  7642 -116 -7644 0
 7640  7641  7642 -116  7645 0

c  1+1 --> 2
c    (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0 ∧  p_116) -> (-b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0)
c  in CNF:
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_2
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨  b^{4, 30}_1
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ -p_116 ∨ -b^{4, 30}_0
c  in DIMACS:
 7640  7641 -7642 -116 -7643 0
 7640  7641 -7642 -116  7644 0
 7640  7641 -7642 -116 -7645 0

c  2+1 --> break 
c    (-b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧  p_116) -> break
c  in CNF:
c     b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 7640 -7641  7642 -116 1162 0


c  2-1 --> 1
c    (-b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧ -p_116) -> (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0)
c  in CNF:
c     b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_2
c     b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_1
c     b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨  b^{4, 30}_0
c  in DIMACS:
 7640 -7641  7642  116 -7643 0
 7640 -7641  7642  116 -7644 0
 7640 -7641  7642  116  7645 0

c  1-1 --> 0
c    (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0 ∧ -p_116) -> (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧ -b^{4, 30}_0)
c  in CNF:
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_2
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_1
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_0
c  in DIMACS:
 7640  7641 -7642  116 -7643 0
 7640  7641 -7642  116 -7644 0
 7640  7641 -7642  116 -7645 0

c  0-1 --> -1
c    (-b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧ -p_116) -> ( b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0)
c  in CNF:
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨  b^{4, 30}_2
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_1
c     b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨  b^{4, 30}_0
c  in DIMACS:
 7640  7641  7642  116  7643 0
 7640  7641  7642  116 -7644 0
 7640  7641  7642  116  7645 0

c  -1-1 --> -2
c    ( b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧  b^{4, 29}_0 ∧ -p_116) -> ( b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0)
c  in CNF:
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨  b^{4, 30}_2
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨  b^{4, 30}_1
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨  p_116 ∨ -b^{4, 30}_0
c  in DIMACS:
-7640  7641 -7642  116  7643 0
-7640  7641 -7642  116  7644 0
-7640  7641 -7642  116 -7645 0

c  -2-1 --> break 
c    ( b^{4, 29}_2 ∧  b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨  b^{4, 29}_0 ∨  p_116 ∨ break
c  in DIMACS:
-7640 -7641  7642  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 29}_2 ∧ -b^{4, 29}_1 ∧ -b^{4, 29}_0 ∧ true) 
c  in CNF:
c    -b^{4, 29}_2 ∨  b^{4, 29}_1 ∨  b^{4, 29}_0 ∨ false 
c  in DIMACS:
-7640  7641  7642  0

c  3 does not represent an automaton state.
c    -(-b^{4, 29}_2 ∧  b^{4, 29}_1 ∧  b^{4, 29}_0 ∧ true) 
c  in CNF:
c     b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ false 
c  in DIMACS:
 7640 -7641 -7642  0
c  -3 does not represent an automaton state.
c    -( b^{4, 29}_2 ∧  b^{4, 29}_1 ∧  b^{4, 29}_0 ∧ true) 
c  in CNF:
c    -b^{4, 29}_2 ∨ -b^{4, 29}_1 ∨ -b^{4, 29}_0 ∨ false 
c  in DIMACS:
-7640 -7641 -7642  0

c i = 30
c  -2+1 --> -1
c    ( b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧  p_120) -> ( b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0)
c  in CNF:
c    -b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨  b^{4, 31}_2
c    -b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_1
c    -b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨  b^{4, 31}_0
c  in DIMACS:
-7643 -7644  7645 -120  7646 0
-7643 -7644  7645 -120 -7647 0
-7643 -7644  7645 -120  7648 0

c  -1+1 --> 0
c    ( b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0 ∧  p_120) -> (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧ -b^{4, 31}_0)
c  in CNF:
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_2
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_1
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_0
c  in DIMACS:
-7643  7644 -7645 -120 -7646 0
-7643  7644 -7645 -120 -7647 0
-7643  7644 -7645 -120 -7648 0

c  0+1 --> 1
c    (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧  p_120) -> (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0)
c  in CNF:
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_2
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_1
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨  b^{4, 31}_0
c  in DIMACS:
 7643  7644  7645 -120 -7646 0
 7643  7644  7645 -120 -7647 0
 7643  7644  7645 -120  7648 0

c  1+1 --> 2
c    (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0 ∧  p_120) -> (-b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0)
c  in CNF:
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_2
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨  b^{4, 31}_1
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ -p_120 ∨ -b^{4, 31}_0
c  in DIMACS:
 7643  7644 -7645 -120 -7646 0
 7643  7644 -7645 -120  7647 0
 7643  7644 -7645 -120 -7648 0

c  2+1 --> break 
c    (-b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧  p_120) -> break
c  in CNF:
c     b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 7643 -7644  7645 -120 1162 0


c  2-1 --> 1
c    (-b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧ -p_120) -> (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0)
c  in CNF:
c     b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_2
c     b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_1
c     b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨  b^{4, 31}_0
c  in DIMACS:
 7643 -7644  7645  120 -7646 0
 7643 -7644  7645  120 -7647 0
 7643 -7644  7645  120  7648 0

c  1-1 --> 0
c    (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0 ∧ -p_120) -> (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧ -b^{4, 31}_0)
c  in CNF:
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_2
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_1
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_0
c  in DIMACS:
 7643  7644 -7645  120 -7646 0
 7643  7644 -7645  120 -7647 0
 7643  7644 -7645  120 -7648 0

c  0-1 --> -1
c    (-b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧ -p_120) -> ( b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0)
c  in CNF:
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨  b^{4, 31}_2
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_1
c     b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨  b^{4, 31}_0
c  in DIMACS:
 7643  7644  7645  120  7646 0
 7643  7644  7645  120 -7647 0
 7643  7644  7645  120  7648 0

c  -1-1 --> -2
c    ( b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧  b^{4, 30}_0 ∧ -p_120) -> ( b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0)
c  in CNF:
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨  b^{4, 31}_2
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨  b^{4, 31}_1
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨  p_120 ∨ -b^{4, 31}_0
c  in DIMACS:
-7643  7644 -7645  120  7646 0
-7643  7644 -7645  120  7647 0
-7643  7644 -7645  120 -7648 0

c  -2-1 --> break 
c    ( b^{4, 30}_2 ∧  b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨  b^{4, 30}_0 ∨  p_120 ∨ break
c  in DIMACS:
-7643 -7644  7645  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 30}_2 ∧ -b^{4, 30}_1 ∧ -b^{4, 30}_0 ∧ true) 
c  in CNF:
c    -b^{4, 30}_2 ∨  b^{4, 30}_1 ∨  b^{4, 30}_0 ∨ false 
c  in DIMACS:
-7643  7644  7645  0

c  3 does not represent an automaton state.
c    -(-b^{4, 30}_2 ∧  b^{4, 30}_1 ∧  b^{4, 30}_0 ∧ true) 
c  in CNF:
c     b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ false 
c  in DIMACS:
 7643 -7644 -7645  0
c  -3 does not represent an automaton state.
c    -( b^{4, 30}_2 ∧  b^{4, 30}_1 ∧  b^{4, 30}_0 ∧ true) 
c  in CNF:
c    -b^{4, 30}_2 ∨ -b^{4, 30}_1 ∨ -b^{4, 30}_0 ∨ false 
c  in DIMACS:
-7643 -7644 -7645  0

c i = 31
c  -2+1 --> -1
c    ( b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧  p_124) -> ( b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0)
c  in CNF:
c    -b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨  b^{4, 32}_2
c    -b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_1
c    -b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨  b^{4, 32}_0
c  in DIMACS:
-7646 -7647  7648 -124  7649 0
-7646 -7647  7648 -124 -7650 0
-7646 -7647  7648 -124  7651 0

c  -1+1 --> 0
c    ( b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0 ∧  p_124) -> (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧ -b^{4, 32}_0)
c  in CNF:
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_2
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_1
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_0
c  in DIMACS:
-7646  7647 -7648 -124 -7649 0
-7646  7647 -7648 -124 -7650 0
-7646  7647 -7648 -124 -7651 0

c  0+1 --> 1
c    (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧  p_124) -> (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0)
c  in CNF:
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_2
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_1
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨  b^{4, 32}_0
c  in DIMACS:
 7646  7647  7648 -124 -7649 0
 7646  7647  7648 -124 -7650 0
 7646  7647  7648 -124  7651 0

c  1+1 --> 2
c    (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0 ∧  p_124) -> (-b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0)
c  in CNF:
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_2
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨  b^{4, 32}_1
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ -p_124 ∨ -b^{4, 32}_0
c  in DIMACS:
 7646  7647 -7648 -124 -7649 0
 7646  7647 -7648 -124  7650 0
 7646  7647 -7648 -124 -7651 0

c  2+1 --> break 
c    (-b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧  p_124) -> break
c  in CNF:
c     b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 7646 -7647  7648 -124 1162 0


c  2-1 --> 1
c    (-b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧ -p_124) -> (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0)
c  in CNF:
c     b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_2
c     b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_1
c     b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨  b^{4, 32}_0
c  in DIMACS:
 7646 -7647  7648  124 -7649 0
 7646 -7647  7648  124 -7650 0
 7646 -7647  7648  124  7651 0

c  1-1 --> 0
c    (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0 ∧ -p_124) -> (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧ -b^{4, 32}_0)
c  in CNF:
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_2
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_1
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_0
c  in DIMACS:
 7646  7647 -7648  124 -7649 0
 7646  7647 -7648  124 -7650 0
 7646  7647 -7648  124 -7651 0

c  0-1 --> -1
c    (-b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧ -p_124) -> ( b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0)
c  in CNF:
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨  b^{4, 32}_2
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_1
c     b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨  b^{4, 32}_0
c  in DIMACS:
 7646  7647  7648  124  7649 0
 7646  7647  7648  124 -7650 0
 7646  7647  7648  124  7651 0

c  -1-1 --> -2
c    ( b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧  b^{4, 31}_0 ∧ -p_124) -> ( b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0)
c  in CNF:
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨  b^{4, 32}_2
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨  b^{4, 32}_1
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨  p_124 ∨ -b^{4, 32}_0
c  in DIMACS:
-7646  7647 -7648  124  7649 0
-7646  7647 -7648  124  7650 0
-7646  7647 -7648  124 -7651 0

c  -2-1 --> break 
c    ( b^{4, 31}_2 ∧  b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨  b^{4, 31}_0 ∨  p_124 ∨ break
c  in DIMACS:
-7646 -7647  7648  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 31}_2 ∧ -b^{4, 31}_1 ∧ -b^{4, 31}_0 ∧ true) 
c  in CNF:
c    -b^{4, 31}_2 ∨  b^{4, 31}_1 ∨  b^{4, 31}_0 ∨ false 
c  in DIMACS:
-7646  7647  7648  0

c  3 does not represent an automaton state.
c    -(-b^{4, 31}_2 ∧  b^{4, 31}_1 ∧  b^{4, 31}_0 ∧ true) 
c  in CNF:
c     b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ false 
c  in DIMACS:
 7646 -7647 -7648  0
c  -3 does not represent an automaton state.
c    -( b^{4, 31}_2 ∧  b^{4, 31}_1 ∧  b^{4, 31}_0 ∧ true) 
c  in CNF:
c    -b^{4, 31}_2 ∨ -b^{4, 31}_1 ∨ -b^{4, 31}_0 ∨ false 
c  in DIMACS:
-7646 -7647 -7648  0

c i = 32
c  -2+1 --> -1
c    ( b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧  p_128) -> ( b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0)
c  in CNF:
c    -b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨  b^{4, 33}_2
c    -b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_1
c    -b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨  b^{4, 33}_0
c  in DIMACS:
-7649 -7650  7651 -128  7652 0
-7649 -7650  7651 -128 -7653 0
-7649 -7650  7651 -128  7654 0

c  -1+1 --> 0
c    ( b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0 ∧  p_128) -> (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧ -b^{4, 33}_0)
c  in CNF:
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_2
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_1
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_0
c  in DIMACS:
-7649  7650 -7651 -128 -7652 0
-7649  7650 -7651 -128 -7653 0
-7649  7650 -7651 -128 -7654 0

c  0+1 --> 1
c    (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧  p_128) -> (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0)
c  in CNF:
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_2
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_1
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨  b^{4, 33}_0
c  in DIMACS:
 7649  7650  7651 -128 -7652 0
 7649  7650  7651 -128 -7653 0
 7649  7650  7651 -128  7654 0

c  1+1 --> 2
c    (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0 ∧  p_128) -> (-b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0)
c  in CNF:
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_2
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨  b^{4, 33}_1
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ -p_128 ∨ -b^{4, 33}_0
c  in DIMACS:
 7649  7650 -7651 -128 -7652 0
 7649  7650 -7651 -128  7653 0
 7649  7650 -7651 -128 -7654 0

c  2+1 --> break 
c    (-b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧  p_128) -> break
c  in CNF:
c     b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 7649 -7650  7651 -128 1162 0


c  2-1 --> 1
c    (-b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧ -p_128) -> (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0)
c  in CNF:
c     b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_2
c     b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_1
c     b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨  b^{4, 33}_0
c  in DIMACS:
 7649 -7650  7651  128 -7652 0
 7649 -7650  7651  128 -7653 0
 7649 -7650  7651  128  7654 0

c  1-1 --> 0
c    (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0 ∧ -p_128) -> (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧ -b^{4, 33}_0)
c  in CNF:
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_2
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_1
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_0
c  in DIMACS:
 7649  7650 -7651  128 -7652 0
 7649  7650 -7651  128 -7653 0
 7649  7650 -7651  128 -7654 0

c  0-1 --> -1
c    (-b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧ -p_128) -> ( b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0)
c  in CNF:
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨  b^{4, 33}_2
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_1
c     b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨  b^{4, 33}_0
c  in DIMACS:
 7649  7650  7651  128  7652 0
 7649  7650  7651  128 -7653 0
 7649  7650  7651  128  7654 0

c  -1-1 --> -2
c    ( b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧  b^{4, 32}_0 ∧ -p_128) -> ( b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0)
c  in CNF:
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨  b^{4, 33}_2
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨  b^{4, 33}_1
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨  p_128 ∨ -b^{4, 33}_0
c  in DIMACS:
-7649  7650 -7651  128  7652 0
-7649  7650 -7651  128  7653 0
-7649  7650 -7651  128 -7654 0

c  -2-1 --> break 
c    ( b^{4, 32}_2 ∧  b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨  b^{4, 32}_0 ∨  p_128 ∨ break
c  in DIMACS:
-7649 -7650  7651  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 32}_2 ∧ -b^{4, 32}_1 ∧ -b^{4, 32}_0 ∧ true) 
c  in CNF:
c    -b^{4, 32}_2 ∨  b^{4, 32}_1 ∨  b^{4, 32}_0 ∨ false 
c  in DIMACS:
-7649  7650  7651  0

c  3 does not represent an automaton state.
c    -(-b^{4, 32}_2 ∧  b^{4, 32}_1 ∧  b^{4, 32}_0 ∧ true) 
c  in CNF:
c     b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ false 
c  in DIMACS:
 7649 -7650 -7651  0
c  -3 does not represent an automaton state.
c    -( b^{4, 32}_2 ∧  b^{4, 32}_1 ∧  b^{4, 32}_0 ∧ true) 
c  in CNF:
c    -b^{4, 32}_2 ∨ -b^{4, 32}_1 ∨ -b^{4, 32}_0 ∨ false 
c  in DIMACS:
-7649 -7650 -7651  0

c i = 33
c  -2+1 --> -1
c    ( b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧  p_132) -> ( b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0)
c  in CNF:
c    -b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨  b^{4, 34}_2
c    -b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_1
c    -b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨  b^{4, 34}_0
c  in DIMACS:
-7652 -7653  7654 -132  7655 0
-7652 -7653  7654 -132 -7656 0
-7652 -7653  7654 -132  7657 0

c  -1+1 --> 0
c    ( b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0 ∧  p_132) -> (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧ -b^{4, 34}_0)
c  in CNF:
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_2
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_1
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_0
c  in DIMACS:
-7652  7653 -7654 -132 -7655 0
-7652  7653 -7654 -132 -7656 0
-7652  7653 -7654 -132 -7657 0

c  0+1 --> 1
c    (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧  p_132) -> (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0)
c  in CNF:
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_2
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_1
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨  b^{4, 34}_0
c  in DIMACS:
 7652  7653  7654 -132 -7655 0
 7652  7653  7654 -132 -7656 0
 7652  7653  7654 -132  7657 0

c  1+1 --> 2
c    (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0 ∧  p_132) -> (-b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0)
c  in CNF:
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_2
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨  b^{4, 34}_1
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ -p_132 ∨ -b^{4, 34}_0
c  in DIMACS:
 7652  7653 -7654 -132 -7655 0
 7652  7653 -7654 -132  7656 0
 7652  7653 -7654 -132 -7657 0

c  2+1 --> break 
c    (-b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧  p_132) -> break
c  in CNF:
c     b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 7652 -7653  7654 -132 1162 0


c  2-1 --> 1
c    (-b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧ -p_132) -> (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0)
c  in CNF:
c     b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_2
c     b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_1
c     b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨  b^{4, 34}_0
c  in DIMACS:
 7652 -7653  7654  132 -7655 0
 7652 -7653  7654  132 -7656 0
 7652 -7653  7654  132  7657 0

c  1-1 --> 0
c    (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0 ∧ -p_132) -> (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧ -b^{4, 34}_0)
c  in CNF:
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_2
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_1
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_0
c  in DIMACS:
 7652  7653 -7654  132 -7655 0
 7652  7653 -7654  132 -7656 0
 7652  7653 -7654  132 -7657 0

c  0-1 --> -1
c    (-b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧ -p_132) -> ( b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0)
c  in CNF:
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨  b^{4, 34}_2
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_1
c     b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨  b^{4, 34}_0
c  in DIMACS:
 7652  7653  7654  132  7655 0
 7652  7653  7654  132 -7656 0
 7652  7653  7654  132  7657 0

c  -1-1 --> -2
c    ( b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧  b^{4, 33}_0 ∧ -p_132) -> ( b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0)
c  in CNF:
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨  b^{4, 34}_2
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨  b^{4, 34}_1
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨  p_132 ∨ -b^{4, 34}_0
c  in DIMACS:
-7652  7653 -7654  132  7655 0
-7652  7653 -7654  132  7656 0
-7652  7653 -7654  132 -7657 0

c  -2-1 --> break 
c    ( b^{4, 33}_2 ∧  b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨  b^{4, 33}_0 ∨  p_132 ∨ break
c  in DIMACS:
-7652 -7653  7654  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 33}_2 ∧ -b^{4, 33}_1 ∧ -b^{4, 33}_0 ∧ true) 
c  in CNF:
c    -b^{4, 33}_2 ∨  b^{4, 33}_1 ∨  b^{4, 33}_0 ∨ false 
c  in DIMACS:
-7652  7653  7654  0

c  3 does not represent an automaton state.
c    -(-b^{4, 33}_2 ∧  b^{4, 33}_1 ∧  b^{4, 33}_0 ∧ true) 
c  in CNF:
c     b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ false 
c  in DIMACS:
 7652 -7653 -7654  0
c  -3 does not represent an automaton state.
c    -( b^{4, 33}_2 ∧  b^{4, 33}_1 ∧  b^{4, 33}_0 ∧ true) 
c  in CNF:
c    -b^{4, 33}_2 ∨ -b^{4, 33}_1 ∨ -b^{4, 33}_0 ∨ false 
c  in DIMACS:
-7652 -7653 -7654  0

c i = 34
c  -2+1 --> -1
c    ( b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧  p_136) -> ( b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0)
c  in CNF:
c    -b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨  b^{4, 35}_2
c    -b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_1
c    -b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨  b^{4, 35}_0
c  in DIMACS:
-7655 -7656  7657 -136  7658 0
-7655 -7656  7657 -136 -7659 0
-7655 -7656  7657 -136  7660 0

c  -1+1 --> 0
c    ( b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0 ∧  p_136) -> (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧ -b^{4, 35}_0)
c  in CNF:
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_2
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_1
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_0
c  in DIMACS:
-7655  7656 -7657 -136 -7658 0
-7655  7656 -7657 -136 -7659 0
-7655  7656 -7657 -136 -7660 0

c  0+1 --> 1
c    (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧  p_136) -> (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0)
c  in CNF:
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_2
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_1
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨  b^{4, 35}_0
c  in DIMACS:
 7655  7656  7657 -136 -7658 0
 7655  7656  7657 -136 -7659 0
 7655  7656  7657 -136  7660 0

c  1+1 --> 2
c    (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0 ∧  p_136) -> (-b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0)
c  in CNF:
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_2
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨  b^{4, 35}_1
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ -p_136 ∨ -b^{4, 35}_0
c  in DIMACS:
 7655  7656 -7657 -136 -7658 0
 7655  7656 -7657 -136  7659 0
 7655  7656 -7657 -136 -7660 0

c  2+1 --> break 
c    (-b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧  p_136) -> break
c  in CNF:
c     b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 7655 -7656  7657 -136 1162 0


c  2-1 --> 1
c    (-b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧ -p_136) -> (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0)
c  in CNF:
c     b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_2
c     b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_1
c     b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨  b^{4, 35}_0
c  in DIMACS:
 7655 -7656  7657  136 -7658 0
 7655 -7656  7657  136 -7659 0
 7655 -7656  7657  136  7660 0

c  1-1 --> 0
c    (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0 ∧ -p_136) -> (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧ -b^{4, 35}_0)
c  in CNF:
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_2
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_1
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_0
c  in DIMACS:
 7655  7656 -7657  136 -7658 0
 7655  7656 -7657  136 -7659 0
 7655  7656 -7657  136 -7660 0

c  0-1 --> -1
c    (-b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧ -p_136) -> ( b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0)
c  in CNF:
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨  b^{4, 35}_2
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_1
c     b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨  b^{4, 35}_0
c  in DIMACS:
 7655  7656  7657  136  7658 0
 7655  7656  7657  136 -7659 0
 7655  7656  7657  136  7660 0

c  -1-1 --> -2
c    ( b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧  b^{4, 34}_0 ∧ -p_136) -> ( b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0)
c  in CNF:
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨  b^{4, 35}_2
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨  b^{4, 35}_1
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨  p_136 ∨ -b^{4, 35}_0
c  in DIMACS:
-7655  7656 -7657  136  7658 0
-7655  7656 -7657  136  7659 0
-7655  7656 -7657  136 -7660 0

c  -2-1 --> break 
c    ( b^{4, 34}_2 ∧  b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨  b^{4, 34}_0 ∨  p_136 ∨ break
c  in DIMACS:
-7655 -7656  7657  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 34}_2 ∧ -b^{4, 34}_1 ∧ -b^{4, 34}_0 ∧ true) 
c  in CNF:
c    -b^{4, 34}_2 ∨  b^{4, 34}_1 ∨  b^{4, 34}_0 ∨ false 
c  in DIMACS:
-7655  7656  7657  0

c  3 does not represent an automaton state.
c    -(-b^{4, 34}_2 ∧  b^{4, 34}_1 ∧  b^{4, 34}_0 ∧ true) 
c  in CNF:
c     b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ false 
c  in DIMACS:
 7655 -7656 -7657  0
c  -3 does not represent an automaton state.
c    -( b^{4, 34}_2 ∧  b^{4, 34}_1 ∧  b^{4, 34}_0 ∧ true) 
c  in CNF:
c    -b^{4, 34}_2 ∨ -b^{4, 34}_1 ∨ -b^{4, 34}_0 ∨ false 
c  in DIMACS:
-7655 -7656 -7657  0

c i = 35
c  -2+1 --> -1
c    ( b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧  p_140) -> ( b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0)
c  in CNF:
c    -b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨  b^{4, 36}_2
c    -b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_1
c    -b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨  b^{4, 36}_0
c  in DIMACS:
-7658 -7659  7660 -140  7661 0
-7658 -7659  7660 -140 -7662 0
-7658 -7659  7660 -140  7663 0

c  -1+1 --> 0
c    ( b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0 ∧  p_140) -> (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧ -b^{4, 36}_0)
c  in CNF:
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_2
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_1
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_0
c  in DIMACS:
-7658  7659 -7660 -140 -7661 0
-7658  7659 -7660 -140 -7662 0
-7658  7659 -7660 -140 -7663 0

c  0+1 --> 1
c    (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧  p_140) -> (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0)
c  in CNF:
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_2
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_1
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨  b^{4, 36}_0
c  in DIMACS:
 7658  7659  7660 -140 -7661 0
 7658  7659  7660 -140 -7662 0
 7658  7659  7660 -140  7663 0

c  1+1 --> 2
c    (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0 ∧  p_140) -> (-b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0)
c  in CNF:
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_2
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨  b^{4, 36}_1
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ -p_140 ∨ -b^{4, 36}_0
c  in DIMACS:
 7658  7659 -7660 -140 -7661 0
 7658  7659 -7660 -140  7662 0
 7658  7659 -7660 -140 -7663 0

c  2+1 --> break 
c    (-b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧  p_140) -> break
c  in CNF:
c     b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 7658 -7659  7660 -140 1162 0


c  2-1 --> 1
c    (-b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧ -p_140) -> (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0)
c  in CNF:
c     b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_2
c     b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_1
c     b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨  b^{4, 36}_0
c  in DIMACS:
 7658 -7659  7660  140 -7661 0
 7658 -7659  7660  140 -7662 0
 7658 -7659  7660  140  7663 0

c  1-1 --> 0
c    (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0 ∧ -p_140) -> (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧ -b^{4, 36}_0)
c  in CNF:
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_2
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_1
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_0
c  in DIMACS:
 7658  7659 -7660  140 -7661 0
 7658  7659 -7660  140 -7662 0
 7658  7659 -7660  140 -7663 0

c  0-1 --> -1
c    (-b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧ -p_140) -> ( b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0)
c  in CNF:
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨  b^{4, 36}_2
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_1
c     b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨  b^{4, 36}_0
c  in DIMACS:
 7658  7659  7660  140  7661 0
 7658  7659  7660  140 -7662 0
 7658  7659  7660  140  7663 0

c  -1-1 --> -2
c    ( b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧  b^{4, 35}_0 ∧ -p_140) -> ( b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0)
c  in CNF:
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨  b^{4, 36}_2
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨  b^{4, 36}_1
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨  p_140 ∨ -b^{4, 36}_0
c  in DIMACS:
-7658  7659 -7660  140  7661 0
-7658  7659 -7660  140  7662 0
-7658  7659 -7660  140 -7663 0

c  -2-1 --> break 
c    ( b^{4, 35}_2 ∧  b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨  b^{4, 35}_0 ∨  p_140 ∨ break
c  in DIMACS:
-7658 -7659  7660  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 35}_2 ∧ -b^{4, 35}_1 ∧ -b^{4, 35}_0 ∧ true) 
c  in CNF:
c    -b^{4, 35}_2 ∨  b^{4, 35}_1 ∨  b^{4, 35}_0 ∨ false 
c  in DIMACS:
-7658  7659  7660  0

c  3 does not represent an automaton state.
c    -(-b^{4, 35}_2 ∧  b^{4, 35}_1 ∧  b^{4, 35}_0 ∧ true) 
c  in CNF:
c     b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ false 
c  in DIMACS:
 7658 -7659 -7660  0
c  -3 does not represent an automaton state.
c    -( b^{4, 35}_2 ∧  b^{4, 35}_1 ∧  b^{4, 35}_0 ∧ true) 
c  in CNF:
c    -b^{4, 35}_2 ∨ -b^{4, 35}_1 ∨ -b^{4, 35}_0 ∨ false 
c  in DIMACS:
-7658 -7659 -7660  0

c i = 36
c  -2+1 --> -1
c    ( b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧  p_144) -> ( b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0)
c  in CNF:
c    -b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨  b^{4, 37}_2
c    -b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_1
c    -b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨  b^{4, 37}_0
c  in DIMACS:
-7661 -7662  7663 -144  7664 0
-7661 -7662  7663 -144 -7665 0
-7661 -7662  7663 -144  7666 0

c  -1+1 --> 0
c    ( b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0 ∧  p_144) -> (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧ -b^{4, 37}_0)
c  in CNF:
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_2
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_1
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_0
c  in DIMACS:
-7661  7662 -7663 -144 -7664 0
-7661  7662 -7663 -144 -7665 0
-7661  7662 -7663 -144 -7666 0

c  0+1 --> 1
c    (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧  p_144) -> (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0)
c  in CNF:
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_2
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_1
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨  b^{4, 37}_0
c  in DIMACS:
 7661  7662  7663 -144 -7664 0
 7661  7662  7663 -144 -7665 0
 7661  7662  7663 -144  7666 0

c  1+1 --> 2
c    (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0 ∧  p_144) -> (-b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0)
c  in CNF:
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_2
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨  b^{4, 37}_1
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ -p_144 ∨ -b^{4, 37}_0
c  in DIMACS:
 7661  7662 -7663 -144 -7664 0
 7661  7662 -7663 -144  7665 0
 7661  7662 -7663 -144 -7666 0

c  2+1 --> break 
c    (-b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧  p_144) -> break
c  in CNF:
c     b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 7661 -7662  7663 -144 1162 0


c  2-1 --> 1
c    (-b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧ -p_144) -> (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0)
c  in CNF:
c     b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_2
c     b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_1
c     b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨  b^{4, 37}_0
c  in DIMACS:
 7661 -7662  7663  144 -7664 0
 7661 -7662  7663  144 -7665 0
 7661 -7662  7663  144  7666 0

c  1-1 --> 0
c    (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0 ∧ -p_144) -> (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧ -b^{4, 37}_0)
c  in CNF:
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_2
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_1
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_0
c  in DIMACS:
 7661  7662 -7663  144 -7664 0
 7661  7662 -7663  144 -7665 0
 7661  7662 -7663  144 -7666 0

c  0-1 --> -1
c    (-b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧ -p_144) -> ( b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0)
c  in CNF:
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨  b^{4, 37}_2
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_1
c     b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨  b^{4, 37}_0
c  in DIMACS:
 7661  7662  7663  144  7664 0
 7661  7662  7663  144 -7665 0
 7661  7662  7663  144  7666 0

c  -1-1 --> -2
c    ( b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧  b^{4, 36}_0 ∧ -p_144) -> ( b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0)
c  in CNF:
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨  b^{4, 37}_2
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨  b^{4, 37}_1
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨  p_144 ∨ -b^{4, 37}_0
c  in DIMACS:
-7661  7662 -7663  144  7664 0
-7661  7662 -7663  144  7665 0
-7661  7662 -7663  144 -7666 0

c  -2-1 --> break 
c    ( b^{4, 36}_2 ∧  b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨  b^{4, 36}_0 ∨  p_144 ∨ break
c  in DIMACS:
-7661 -7662  7663  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 36}_2 ∧ -b^{4, 36}_1 ∧ -b^{4, 36}_0 ∧ true) 
c  in CNF:
c    -b^{4, 36}_2 ∨  b^{4, 36}_1 ∨  b^{4, 36}_0 ∨ false 
c  in DIMACS:
-7661  7662  7663  0

c  3 does not represent an automaton state.
c    -(-b^{4, 36}_2 ∧  b^{4, 36}_1 ∧  b^{4, 36}_0 ∧ true) 
c  in CNF:
c     b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ false 
c  in DIMACS:
 7661 -7662 -7663  0
c  -3 does not represent an automaton state.
c    -( b^{4, 36}_2 ∧  b^{4, 36}_1 ∧  b^{4, 36}_0 ∧ true) 
c  in CNF:
c    -b^{4, 36}_2 ∨ -b^{4, 36}_1 ∨ -b^{4, 36}_0 ∨ false 
c  in DIMACS:
-7661 -7662 -7663  0

c i = 37
c  -2+1 --> -1
c    ( b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧  p_148) -> ( b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0)
c  in CNF:
c    -b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨  b^{4, 38}_2
c    -b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_1
c    -b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨  b^{4, 38}_0
c  in DIMACS:
-7664 -7665  7666 -148  7667 0
-7664 -7665  7666 -148 -7668 0
-7664 -7665  7666 -148  7669 0

c  -1+1 --> 0
c    ( b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0 ∧  p_148) -> (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧ -b^{4, 38}_0)
c  in CNF:
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_2
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_1
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_0
c  in DIMACS:
-7664  7665 -7666 -148 -7667 0
-7664  7665 -7666 -148 -7668 0
-7664  7665 -7666 -148 -7669 0

c  0+1 --> 1
c    (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧  p_148) -> (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0)
c  in CNF:
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_2
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_1
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨  b^{4, 38}_0
c  in DIMACS:
 7664  7665  7666 -148 -7667 0
 7664  7665  7666 -148 -7668 0
 7664  7665  7666 -148  7669 0

c  1+1 --> 2
c    (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0 ∧  p_148) -> (-b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0)
c  in CNF:
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_2
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨  b^{4, 38}_1
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ -p_148 ∨ -b^{4, 38}_0
c  in DIMACS:
 7664  7665 -7666 -148 -7667 0
 7664  7665 -7666 -148  7668 0
 7664  7665 -7666 -148 -7669 0

c  2+1 --> break 
c    (-b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧  p_148) -> break
c  in CNF:
c     b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 7664 -7665  7666 -148 1162 0


c  2-1 --> 1
c    (-b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧ -p_148) -> (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0)
c  in CNF:
c     b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_2
c     b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_1
c     b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨  b^{4, 38}_0
c  in DIMACS:
 7664 -7665  7666  148 -7667 0
 7664 -7665  7666  148 -7668 0
 7664 -7665  7666  148  7669 0

c  1-1 --> 0
c    (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0 ∧ -p_148) -> (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧ -b^{4, 38}_0)
c  in CNF:
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_2
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_1
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_0
c  in DIMACS:
 7664  7665 -7666  148 -7667 0
 7664  7665 -7666  148 -7668 0
 7664  7665 -7666  148 -7669 0

c  0-1 --> -1
c    (-b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧ -p_148) -> ( b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0)
c  in CNF:
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨  b^{4, 38}_2
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_1
c     b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨  b^{4, 38}_0
c  in DIMACS:
 7664  7665  7666  148  7667 0
 7664  7665  7666  148 -7668 0
 7664  7665  7666  148  7669 0

c  -1-1 --> -2
c    ( b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧  b^{4, 37}_0 ∧ -p_148) -> ( b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0)
c  in CNF:
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨  b^{4, 38}_2
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨  b^{4, 38}_1
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨  p_148 ∨ -b^{4, 38}_0
c  in DIMACS:
-7664  7665 -7666  148  7667 0
-7664  7665 -7666  148  7668 0
-7664  7665 -7666  148 -7669 0

c  -2-1 --> break 
c    ( b^{4, 37}_2 ∧  b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨  b^{4, 37}_0 ∨  p_148 ∨ break
c  in DIMACS:
-7664 -7665  7666  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 37}_2 ∧ -b^{4, 37}_1 ∧ -b^{4, 37}_0 ∧ true) 
c  in CNF:
c    -b^{4, 37}_2 ∨  b^{4, 37}_1 ∨  b^{4, 37}_0 ∨ false 
c  in DIMACS:
-7664  7665  7666  0

c  3 does not represent an automaton state.
c    -(-b^{4, 37}_2 ∧  b^{4, 37}_1 ∧  b^{4, 37}_0 ∧ true) 
c  in CNF:
c     b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ false 
c  in DIMACS:
 7664 -7665 -7666  0
c  -3 does not represent an automaton state.
c    -( b^{4, 37}_2 ∧  b^{4, 37}_1 ∧  b^{4, 37}_0 ∧ true) 
c  in CNF:
c    -b^{4, 37}_2 ∨ -b^{4, 37}_1 ∨ -b^{4, 37}_0 ∨ false 
c  in DIMACS:
-7664 -7665 -7666  0

c i = 38
c  -2+1 --> -1
c    ( b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧  p_152) -> ( b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0)
c  in CNF:
c    -b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨  b^{4, 39}_2
c    -b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_1
c    -b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨  b^{4, 39}_0
c  in DIMACS:
-7667 -7668  7669 -152  7670 0
-7667 -7668  7669 -152 -7671 0
-7667 -7668  7669 -152  7672 0

c  -1+1 --> 0
c    ( b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0 ∧  p_152) -> (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧ -b^{4, 39}_0)
c  in CNF:
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_2
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_1
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_0
c  in DIMACS:
-7667  7668 -7669 -152 -7670 0
-7667  7668 -7669 -152 -7671 0
-7667  7668 -7669 -152 -7672 0

c  0+1 --> 1
c    (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧  p_152) -> (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0)
c  in CNF:
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_2
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_1
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨  b^{4, 39}_0
c  in DIMACS:
 7667  7668  7669 -152 -7670 0
 7667  7668  7669 -152 -7671 0
 7667  7668  7669 -152  7672 0

c  1+1 --> 2
c    (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0 ∧  p_152) -> (-b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0)
c  in CNF:
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_2
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨  b^{4, 39}_1
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ -p_152 ∨ -b^{4, 39}_0
c  in DIMACS:
 7667  7668 -7669 -152 -7670 0
 7667  7668 -7669 -152  7671 0
 7667  7668 -7669 -152 -7672 0

c  2+1 --> break 
c    (-b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧  p_152) -> break
c  in CNF:
c     b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 7667 -7668  7669 -152 1162 0


c  2-1 --> 1
c    (-b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧ -p_152) -> (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0)
c  in CNF:
c     b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_2
c     b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_1
c     b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨  b^{4, 39}_0
c  in DIMACS:
 7667 -7668  7669  152 -7670 0
 7667 -7668  7669  152 -7671 0
 7667 -7668  7669  152  7672 0

c  1-1 --> 0
c    (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0 ∧ -p_152) -> (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧ -b^{4, 39}_0)
c  in CNF:
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_2
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_1
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_0
c  in DIMACS:
 7667  7668 -7669  152 -7670 0
 7667  7668 -7669  152 -7671 0
 7667  7668 -7669  152 -7672 0

c  0-1 --> -1
c    (-b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧ -p_152) -> ( b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0)
c  in CNF:
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨  b^{4, 39}_2
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_1
c     b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨  b^{4, 39}_0
c  in DIMACS:
 7667  7668  7669  152  7670 0
 7667  7668  7669  152 -7671 0
 7667  7668  7669  152  7672 0

c  -1-1 --> -2
c    ( b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧  b^{4, 38}_0 ∧ -p_152) -> ( b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0)
c  in CNF:
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨  b^{4, 39}_2
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨  b^{4, 39}_1
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨  p_152 ∨ -b^{4, 39}_0
c  in DIMACS:
-7667  7668 -7669  152  7670 0
-7667  7668 -7669  152  7671 0
-7667  7668 -7669  152 -7672 0

c  -2-1 --> break 
c    ( b^{4, 38}_2 ∧  b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨  b^{4, 38}_0 ∨  p_152 ∨ break
c  in DIMACS:
-7667 -7668  7669  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 38}_2 ∧ -b^{4, 38}_1 ∧ -b^{4, 38}_0 ∧ true) 
c  in CNF:
c    -b^{4, 38}_2 ∨  b^{4, 38}_1 ∨  b^{4, 38}_0 ∨ false 
c  in DIMACS:
-7667  7668  7669  0

c  3 does not represent an automaton state.
c    -(-b^{4, 38}_2 ∧  b^{4, 38}_1 ∧  b^{4, 38}_0 ∧ true) 
c  in CNF:
c     b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ false 
c  in DIMACS:
 7667 -7668 -7669  0
c  -3 does not represent an automaton state.
c    -( b^{4, 38}_2 ∧  b^{4, 38}_1 ∧  b^{4, 38}_0 ∧ true) 
c  in CNF:
c    -b^{4, 38}_2 ∨ -b^{4, 38}_1 ∨ -b^{4, 38}_0 ∨ false 
c  in DIMACS:
-7667 -7668 -7669  0

c i = 39
c  -2+1 --> -1
c    ( b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧  p_156) -> ( b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0)
c  in CNF:
c    -b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨  b^{4, 40}_2
c    -b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_1
c    -b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨  b^{4, 40}_0
c  in DIMACS:
-7670 -7671  7672 -156  7673 0
-7670 -7671  7672 -156 -7674 0
-7670 -7671  7672 -156  7675 0

c  -1+1 --> 0
c    ( b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0 ∧  p_156) -> (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧ -b^{4, 40}_0)
c  in CNF:
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_2
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_1
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_0
c  in DIMACS:
-7670  7671 -7672 -156 -7673 0
-7670  7671 -7672 -156 -7674 0
-7670  7671 -7672 -156 -7675 0

c  0+1 --> 1
c    (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧  p_156) -> (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0)
c  in CNF:
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_2
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_1
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨  b^{4, 40}_0
c  in DIMACS:
 7670  7671  7672 -156 -7673 0
 7670  7671  7672 -156 -7674 0
 7670  7671  7672 -156  7675 0

c  1+1 --> 2
c    (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0 ∧  p_156) -> (-b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0)
c  in CNF:
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_2
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨  b^{4, 40}_1
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ -p_156 ∨ -b^{4, 40}_0
c  in DIMACS:
 7670  7671 -7672 -156 -7673 0
 7670  7671 -7672 -156  7674 0
 7670  7671 -7672 -156 -7675 0

c  2+1 --> break 
c    (-b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧  p_156) -> break
c  in CNF:
c     b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 7670 -7671  7672 -156 1162 0


c  2-1 --> 1
c    (-b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧ -p_156) -> (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0)
c  in CNF:
c     b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_2
c     b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_1
c     b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨  b^{4, 40}_0
c  in DIMACS:
 7670 -7671  7672  156 -7673 0
 7670 -7671  7672  156 -7674 0
 7670 -7671  7672  156  7675 0

c  1-1 --> 0
c    (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0 ∧ -p_156) -> (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧ -b^{4, 40}_0)
c  in CNF:
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_2
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_1
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_0
c  in DIMACS:
 7670  7671 -7672  156 -7673 0
 7670  7671 -7672  156 -7674 0
 7670  7671 -7672  156 -7675 0

c  0-1 --> -1
c    (-b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧ -p_156) -> ( b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0)
c  in CNF:
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨  b^{4, 40}_2
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_1
c     b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨  b^{4, 40}_0
c  in DIMACS:
 7670  7671  7672  156  7673 0
 7670  7671  7672  156 -7674 0
 7670  7671  7672  156  7675 0

c  -1-1 --> -2
c    ( b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧  b^{4, 39}_0 ∧ -p_156) -> ( b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0)
c  in CNF:
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨  b^{4, 40}_2
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨  b^{4, 40}_1
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨  p_156 ∨ -b^{4, 40}_0
c  in DIMACS:
-7670  7671 -7672  156  7673 0
-7670  7671 -7672  156  7674 0
-7670  7671 -7672  156 -7675 0

c  -2-1 --> break 
c    ( b^{4, 39}_2 ∧  b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨  b^{4, 39}_0 ∨  p_156 ∨ break
c  in DIMACS:
-7670 -7671  7672  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 39}_2 ∧ -b^{4, 39}_1 ∧ -b^{4, 39}_0 ∧ true) 
c  in CNF:
c    -b^{4, 39}_2 ∨  b^{4, 39}_1 ∨  b^{4, 39}_0 ∨ false 
c  in DIMACS:
-7670  7671  7672  0

c  3 does not represent an automaton state.
c    -(-b^{4, 39}_2 ∧  b^{4, 39}_1 ∧  b^{4, 39}_0 ∧ true) 
c  in CNF:
c     b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ false 
c  in DIMACS:
 7670 -7671 -7672  0
c  -3 does not represent an automaton state.
c    -( b^{4, 39}_2 ∧  b^{4, 39}_1 ∧  b^{4, 39}_0 ∧ true) 
c  in CNF:
c    -b^{4, 39}_2 ∨ -b^{4, 39}_1 ∨ -b^{4, 39}_0 ∨ false 
c  in DIMACS:
-7670 -7671 -7672  0

c i = 40
c  -2+1 --> -1
c    ( b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧  p_160) -> ( b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0)
c  in CNF:
c    -b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨  b^{4, 41}_2
c    -b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_1
c    -b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨  b^{4, 41}_0
c  in DIMACS:
-7673 -7674  7675 -160  7676 0
-7673 -7674  7675 -160 -7677 0
-7673 -7674  7675 -160  7678 0

c  -1+1 --> 0
c    ( b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0 ∧  p_160) -> (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧ -b^{4, 41}_0)
c  in CNF:
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_2
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_1
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_0
c  in DIMACS:
-7673  7674 -7675 -160 -7676 0
-7673  7674 -7675 -160 -7677 0
-7673  7674 -7675 -160 -7678 0

c  0+1 --> 1
c    (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧  p_160) -> (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0)
c  in CNF:
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_2
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_1
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨  b^{4, 41}_0
c  in DIMACS:
 7673  7674  7675 -160 -7676 0
 7673  7674  7675 -160 -7677 0
 7673  7674  7675 -160  7678 0

c  1+1 --> 2
c    (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0 ∧  p_160) -> (-b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0)
c  in CNF:
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_2
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨  b^{4, 41}_1
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ -p_160 ∨ -b^{4, 41}_0
c  in DIMACS:
 7673  7674 -7675 -160 -7676 0
 7673  7674 -7675 -160  7677 0
 7673  7674 -7675 -160 -7678 0

c  2+1 --> break 
c    (-b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧  p_160) -> break
c  in CNF:
c     b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 7673 -7674  7675 -160 1162 0


c  2-1 --> 1
c    (-b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧ -p_160) -> (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0)
c  in CNF:
c     b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_2
c     b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_1
c     b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨  b^{4, 41}_0
c  in DIMACS:
 7673 -7674  7675  160 -7676 0
 7673 -7674  7675  160 -7677 0
 7673 -7674  7675  160  7678 0

c  1-1 --> 0
c    (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0 ∧ -p_160) -> (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧ -b^{4, 41}_0)
c  in CNF:
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_2
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_1
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_0
c  in DIMACS:
 7673  7674 -7675  160 -7676 0
 7673  7674 -7675  160 -7677 0
 7673  7674 -7675  160 -7678 0

c  0-1 --> -1
c    (-b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧ -p_160) -> ( b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0)
c  in CNF:
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨  b^{4, 41}_2
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_1
c     b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨  b^{4, 41}_0
c  in DIMACS:
 7673  7674  7675  160  7676 0
 7673  7674  7675  160 -7677 0
 7673  7674  7675  160  7678 0

c  -1-1 --> -2
c    ( b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧  b^{4, 40}_0 ∧ -p_160) -> ( b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0)
c  in CNF:
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨  b^{4, 41}_2
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨  b^{4, 41}_1
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨  p_160 ∨ -b^{4, 41}_0
c  in DIMACS:
-7673  7674 -7675  160  7676 0
-7673  7674 -7675  160  7677 0
-7673  7674 -7675  160 -7678 0

c  -2-1 --> break 
c    ( b^{4, 40}_2 ∧  b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨  b^{4, 40}_0 ∨  p_160 ∨ break
c  in DIMACS:
-7673 -7674  7675  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 40}_2 ∧ -b^{4, 40}_1 ∧ -b^{4, 40}_0 ∧ true) 
c  in CNF:
c    -b^{4, 40}_2 ∨  b^{4, 40}_1 ∨  b^{4, 40}_0 ∨ false 
c  in DIMACS:
-7673  7674  7675  0

c  3 does not represent an automaton state.
c    -(-b^{4, 40}_2 ∧  b^{4, 40}_1 ∧  b^{4, 40}_0 ∧ true) 
c  in CNF:
c     b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ false 
c  in DIMACS:
 7673 -7674 -7675  0
c  -3 does not represent an automaton state.
c    -( b^{4, 40}_2 ∧  b^{4, 40}_1 ∧  b^{4, 40}_0 ∧ true) 
c  in CNF:
c    -b^{4, 40}_2 ∨ -b^{4, 40}_1 ∨ -b^{4, 40}_0 ∨ false 
c  in DIMACS:
-7673 -7674 -7675  0

c i = 41
c  -2+1 --> -1
c    ( b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧  p_164) -> ( b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0)
c  in CNF:
c    -b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨  b^{4, 42}_2
c    -b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_1
c    -b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨  b^{4, 42}_0
c  in DIMACS:
-7676 -7677  7678 -164  7679 0
-7676 -7677  7678 -164 -7680 0
-7676 -7677  7678 -164  7681 0

c  -1+1 --> 0
c    ( b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0 ∧  p_164) -> (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧ -b^{4, 42}_0)
c  in CNF:
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_2
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_1
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_0
c  in DIMACS:
-7676  7677 -7678 -164 -7679 0
-7676  7677 -7678 -164 -7680 0
-7676  7677 -7678 -164 -7681 0

c  0+1 --> 1
c    (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧  p_164) -> (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0)
c  in CNF:
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_2
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_1
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨  b^{4, 42}_0
c  in DIMACS:
 7676  7677  7678 -164 -7679 0
 7676  7677  7678 -164 -7680 0
 7676  7677  7678 -164  7681 0

c  1+1 --> 2
c    (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0 ∧  p_164) -> (-b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0)
c  in CNF:
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_2
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨  b^{4, 42}_1
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ -p_164 ∨ -b^{4, 42}_0
c  in DIMACS:
 7676  7677 -7678 -164 -7679 0
 7676  7677 -7678 -164  7680 0
 7676  7677 -7678 -164 -7681 0

c  2+1 --> break 
c    (-b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧  p_164) -> break
c  in CNF:
c     b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 7676 -7677  7678 -164 1162 0


c  2-1 --> 1
c    (-b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧ -p_164) -> (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0)
c  in CNF:
c     b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_2
c     b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_1
c     b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨  b^{4, 42}_0
c  in DIMACS:
 7676 -7677  7678  164 -7679 0
 7676 -7677  7678  164 -7680 0
 7676 -7677  7678  164  7681 0

c  1-1 --> 0
c    (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0 ∧ -p_164) -> (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧ -b^{4, 42}_0)
c  in CNF:
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_2
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_1
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_0
c  in DIMACS:
 7676  7677 -7678  164 -7679 0
 7676  7677 -7678  164 -7680 0
 7676  7677 -7678  164 -7681 0

c  0-1 --> -1
c    (-b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧ -p_164) -> ( b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0)
c  in CNF:
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨  b^{4, 42}_2
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_1
c     b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨  b^{4, 42}_0
c  in DIMACS:
 7676  7677  7678  164  7679 0
 7676  7677  7678  164 -7680 0
 7676  7677  7678  164  7681 0

c  -1-1 --> -2
c    ( b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧  b^{4, 41}_0 ∧ -p_164) -> ( b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0)
c  in CNF:
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨  b^{4, 42}_2
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨  b^{4, 42}_1
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨  p_164 ∨ -b^{4, 42}_0
c  in DIMACS:
-7676  7677 -7678  164  7679 0
-7676  7677 -7678  164  7680 0
-7676  7677 -7678  164 -7681 0

c  -2-1 --> break 
c    ( b^{4, 41}_2 ∧  b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨  b^{4, 41}_0 ∨  p_164 ∨ break
c  in DIMACS:
-7676 -7677  7678  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 41}_2 ∧ -b^{4, 41}_1 ∧ -b^{4, 41}_0 ∧ true) 
c  in CNF:
c    -b^{4, 41}_2 ∨  b^{4, 41}_1 ∨  b^{4, 41}_0 ∨ false 
c  in DIMACS:
-7676  7677  7678  0

c  3 does not represent an automaton state.
c    -(-b^{4, 41}_2 ∧  b^{4, 41}_1 ∧  b^{4, 41}_0 ∧ true) 
c  in CNF:
c     b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ false 
c  in DIMACS:
 7676 -7677 -7678  0
c  -3 does not represent an automaton state.
c    -( b^{4, 41}_2 ∧  b^{4, 41}_1 ∧  b^{4, 41}_0 ∧ true) 
c  in CNF:
c    -b^{4, 41}_2 ∨ -b^{4, 41}_1 ∨ -b^{4, 41}_0 ∨ false 
c  in DIMACS:
-7676 -7677 -7678  0

c i = 42
c  -2+1 --> -1
c    ( b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧  p_168) -> ( b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0)
c  in CNF:
c    -b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨  b^{4, 43}_2
c    -b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_1
c    -b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨  b^{4, 43}_0
c  in DIMACS:
-7679 -7680  7681 -168  7682 0
-7679 -7680  7681 -168 -7683 0
-7679 -7680  7681 -168  7684 0

c  -1+1 --> 0
c    ( b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0 ∧  p_168) -> (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧ -b^{4, 43}_0)
c  in CNF:
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_2
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_1
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_0
c  in DIMACS:
-7679  7680 -7681 -168 -7682 0
-7679  7680 -7681 -168 -7683 0
-7679  7680 -7681 -168 -7684 0

c  0+1 --> 1
c    (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧  p_168) -> (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0)
c  in CNF:
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_2
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_1
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨  b^{4, 43}_0
c  in DIMACS:
 7679  7680  7681 -168 -7682 0
 7679  7680  7681 -168 -7683 0
 7679  7680  7681 -168  7684 0

c  1+1 --> 2
c    (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0 ∧  p_168) -> (-b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0)
c  in CNF:
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_2
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨  b^{4, 43}_1
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ -p_168 ∨ -b^{4, 43}_0
c  in DIMACS:
 7679  7680 -7681 -168 -7682 0
 7679  7680 -7681 -168  7683 0
 7679  7680 -7681 -168 -7684 0

c  2+1 --> break 
c    (-b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧  p_168) -> break
c  in CNF:
c     b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 7679 -7680  7681 -168 1162 0


c  2-1 --> 1
c    (-b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧ -p_168) -> (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0)
c  in CNF:
c     b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_2
c     b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_1
c     b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨  b^{4, 43}_0
c  in DIMACS:
 7679 -7680  7681  168 -7682 0
 7679 -7680  7681  168 -7683 0
 7679 -7680  7681  168  7684 0

c  1-1 --> 0
c    (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0 ∧ -p_168) -> (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧ -b^{4, 43}_0)
c  in CNF:
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_2
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_1
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_0
c  in DIMACS:
 7679  7680 -7681  168 -7682 0
 7679  7680 -7681  168 -7683 0
 7679  7680 -7681  168 -7684 0

c  0-1 --> -1
c    (-b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧ -p_168) -> ( b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0)
c  in CNF:
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨  b^{4, 43}_2
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_1
c     b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨  b^{4, 43}_0
c  in DIMACS:
 7679  7680  7681  168  7682 0
 7679  7680  7681  168 -7683 0
 7679  7680  7681  168  7684 0

c  -1-1 --> -2
c    ( b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧  b^{4, 42}_0 ∧ -p_168) -> ( b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0)
c  in CNF:
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨  b^{4, 43}_2
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨  b^{4, 43}_1
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨  p_168 ∨ -b^{4, 43}_0
c  in DIMACS:
-7679  7680 -7681  168  7682 0
-7679  7680 -7681  168  7683 0
-7679  7680 -7681  168 -7684 0

c  -2-1 --> break 
c    ( b^{4, 42}_2 ∧  b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨  b^{4, 42}_0 ∨  p_168 ∨ break
c  in DIMACS:
-7679 -7680  7681  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 42}_2 ∧ -b^{4, 42}_1 ∧ -b^{4, 42}_0 ∧ true) 
c  in CNF:
c    -b^{4, 42}_2 ∨  b^{4, 42}_1 ∨  b^{4, 42}_0 ∨ false 
c  in DIMACS:
-7679  7680  7681  0

c  3 does not represent an automaton state.
c    -(-b^{4, 42}_2 ∧  b^{4, 42}_1 ∧  b^{4, 42}_0 ∧ true) 
c  in CNF:
c     b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ false 
c  in DIMACS:
 7679 -7680 -7681  0
c  -3 does not represent an automaton state.
c    -( b^{4, 42}_2 ∧  b^{4, 42}_1 ∧  b^{4, 42}_0 ∧ true) 
c  in CNF:
c    -b^{4, 42}_2 ∨ -b^{4, 42}_1 ∨ -b^{4, 42}_0 ∨ false 
c  in DIMACS:
-7679 -7680 -7681  0

c i = 43
c  -2+1 --> -1
c    ( b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧  p_172) -> ( b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0)
c  in CNF:
c    -b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨  b^{4, 44}_2
c    -b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_1
c    -b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨  b^{4, 44}_0
c  in DIMACS:
-7682 -7683  7684 -172  7685 0
-7682 -7683  7684 -172 -7686 0
-7682 -7683  7684 -172  7687 0

c  -1+1 --> 0
c    ( b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0 ∧  p_172) -> (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧ -b^{4, 44}_0)
c  in CNF:
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_2
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_1
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_0
c  in DIMACS:
-7682  7683 -7684 -172 -7685 0
-7682  7683 -7684 -172 -7686 0
-7682  7683 -7684 -172 -7687 0

c  0+1 --> 1
c    (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧  p_172) -> (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0)
c  in CNF:
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_2
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_1
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨  b^{4, 44}_0
c  in DIMACS:
 7682  7683  7684 -172 -7685 0
 7682  7683  7684 -172 -7686 0
 7682  7683  7684 -172  7687 0

c  1+1 --> 2
c    (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0 ∧  p_172) -> (-b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0)
c  in CNF:
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_2
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨  b^{4, 44}_1
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ -p_172 ∨ -b^{4, 44}_0
c  in DIMACS:
 7682  7683 -7684 -172 -7685 0
 7682  7683 -7684 -172  7686 0
 7682  7683 -7684 -172 -7687 0

c  2+1 --> break 
c    (-b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧  p_172) -> break
c  in CNF:
c     b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 7682 -7683  7684 -172 1162 0


c  2-1 --> 1
c    (-b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧ -p_172) -> (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0)
c  in CNF:
c     b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_2
c     b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_1
c     b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨  b^{4, 44}_0
c  in DIMACS:
 7682 -7683  7684  172 -7685 0
 7682 -7683  7684  172 -7686 0
 7682 -7683  7684  172  7687 0

c  1-1 --> 0
c    (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0 ∧ -p_172) -> (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧ -b^{4, 44}_0)
c  in CNF:
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_2
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_1
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_0
c  in DIMACS:
 7682  7683 -7684  172 -7685 0
 7682  7683 -7684  172 -7686 0
 7682  7683 -7684  172 -7687 0

c  0-1 --> -1
c    (-b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧ -p_172) -> ( b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0)
c  in CNF:
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨  b^{4, 44}_2
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_1
c     b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨  b^{4, 44}_0
c  in DIMACS:
 7682  7683  7684  172  7685 0
 7682  7683  7684  172 -7686 0
 7682  7683  7684  172  7687 0

c  -1-1 --> -2
c    ( b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧  b^{4, 43}_0 ∧ -p_172) -> ( b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0)
c  in CNF:
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨  b^{4, 44}_2
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨  b^{4, 44}_1
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨  p_172 ∨ -b^{4, 44}_0
c  in DIMACS:
-7682  7683 -7684  172  7685 0
-7682  7683 -7684  172  7686 0
-7682  7683 -7684  172 -7687 0

c  -2-1 --> break 
c    ( b^{4, 43}_2 ∧  b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨  b^{4, 43}_0 ∨  p_172 ∨ break
c  in DIMACS:
-7682 -7683  7684  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 43}_2 ∧ -b^{4, 43}_1 ∧ -b^{4, 43}_0 ∧ true) 
c  in CNF:
c    -b^{4, 43}_2 ∨  b^{4, 43}_1 ∨  b^{4, 43}_0 ∨ false 
c  in DIMACS:
-7682  7683  7684  0

c  3 does not represent an automaton state.
c    -(-b^{4, 43}_2 ∧  b^{4, 43}_1 ∧  b^{4, 43}_0 ∧ true) 
c  in CNF:
c     b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ false 
c  in DIMACS:
 7682 -7683 -7684  0
c  -3 does not represent an automaton state.
c    -( b^{4, 43}_2 ∧  b^{4, 43}_1 ∧  b^{4, 43}_0 ∧ true) 
c  in CNF:
c    -b^{4, 43}_2 ∨ -b^{4, 43}_1 ∨ -b^{4, 43}_0 ∨ false 
c  in DIMACS:
-7682 -7683 -7684  0

c i = 44
c  -2+1 --> -1
c    ( b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧  p_176) -> ( b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0)
c  in CNF:
c    -b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨  b^{4, 45}_2
c    -b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_1
c    -b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨  b^{4, 45}_0
c  in DIMACS:
-7685 -7686  7687 -176  7688 0
-7685 -7686  7687 -176 -7689 0
-7685 -7686  7687 -176  7690 0

c  -1+1 --> 0
c    ( b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0 ∧  p_176) -> (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧ -b^{4, 45}_0)
c  in CNF:
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_2
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_1
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_0
c  in DIMACS:
-7685  7686 -7687 -176 -7688 0
-7685  7686 -7687 -176 -7689 0
-7685  7686 -7687 -176 -7690 0

c  0+1 --> 1
c    (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧  p_176) -> (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0)
c  in CNF:
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_2
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_1
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨  b^{4, 45}_0
c  in DIMACS:
 7685  7686  7687 -176 -7688 0
 7685  7686  7687 -176 -7689 0
 7685  7686  7687 -176  7690 0

c  1+1 --> 2
c    (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0 ∧  p_176) -> (-b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0)
c  in CNF:
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_2
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨  b^{4, 45}_1
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ -p_176 ∨ -b^{4, 45}_0
c  in DIMACS:
 7685  7686 -7687 -176 -7688 0
 7685  7686 -7687 -176  7689 0
 7685  7686 -7687 -176 -7690 0

c  2+1 --> break 
c    (-b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧  p_176) -> break
c  in CNF:
c     b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 7685 -7686  7687 -176 1162 0


c  2-1 --> 1
c    (-b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧ -p_176) -> (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0)
c  in CNF:
c     b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_2
c     b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_1
c     b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨  b^{4, 45}_0
c  in DIMACS:
 7685 -7686  7687  176 -7688 0
 7685 -7686  7687  176 -7689 0
 7685 -7686  7687  176  7690 0

c  1-1 --> 0
c    (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0 ∧ -p_176) -> (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧ -b^{4, 45}_0)
c  in CNF:
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_2
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_1
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_0
c  in DIMACS:
 7685  7686 -7687  176 -7688 0
 7685  7686 -7687  176 -7689 0
 7685  7686 -7687  176 -7690 0

c  0-1 --> -1
c    (-b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧ -p_176) -> ( b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0)
c  in CNF:
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨  b^{4, 45}_2
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_1
c     b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨  b^{4, 45}_0
c  in DIMACS:
 7685  7686  7687  176  7688 0
 7685  7686  7687  176 -7689 0
 7685  7686  7687  176  7690 0

c  -1-1 --> -2
c    ( b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧  b^{4, 44}_0 ∧ -p_176) -> ( b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0)
c  in CNF:
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨  b^{4, 45}_2
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨  b^{4, 45}_1
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨  p_176 ∨ -b^{4, 45}_0
c  in DIMACS:
-7685  7686 -7687  176  7688 0
-7685  7686 -7687  176  7689 0
-7685  7686 -7687  176 -7690 0

c  -2-1 --> break 
c    ( b^{4, 44}_2 ∧  b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨  b^{4, 44}_0 ∨  p_176 ∨ break
c  in DIMACS:
-7685 -7686  7687  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 44}_2 ∧ -b^{4, 44}_1 ∧ -b^{4, 44}_0 ∧ true) 
c  in CNF:
c    -b^{4, 44}_2 ∨  b^{4, 44}_1 ∨  b^{4, 44}_0 ∨ false 
c  in DIMACS:
-7685  7686  7687  0

c  3 does not represent an automaton state.
c    -(-b^{4, 44}_2 ∧  b^{4, 44}_1 ∧  b^{4, 44}_0 ∧ true) 
c  in CNF:
c     b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ false 
c  in DIMACS:
 7685 -7686 -7687  0
c  -3 does not represent an automaton state.
c    -( b^{4, 44}_2 ∧  b^{4, 44}_1 ∧  b^{4, 44}_0 ∧ true) 
c  in CNF:
c    -b^{4, 44}_2 ∨ -b^{4, 44}_1 ∨ -b^{4, 44}_0 ∨ false 
c  in DIMACS:
-7685 -7686 -7687  0

c i = 45
c  -2+1 --> -1
c    ( b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧  p_180) -> ( b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0)
c  in CNF:
c    -b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨  b^{4, 46}_2
c    -b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_1
c    -b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨  b^{4, 46}_0
c  in DIMACS:
-7688 -7689  7690 -180  7691 0
-7688 -7689  7690 -180 -7692 0
-7688 -7689  7690 -180  7693 0

c  -1+1 --> 0
c    ( b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0 ∧  p_180) -> (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧ -b^{4, 46}_0)
c  in CNF:
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_2
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_1
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_0
c  in DIMACS:
-7688  7689 -7690 -180 -7691 0
-7688  7689 -7690 -180 -7692 0
-7688  7689 -7690 -180 -7693 0

c  0+1 --> 1
c    (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧  p_180) -> (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0)
c  in CNF:
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_2
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_1
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨  b^{4, 46}_0
c  in DIMACS:
 7688  7689  7690 -180 -7691 0
 7688  7689  7690 -180 -7692 0
 7688  7689  7690 -180  7693 0

c  1+1 --> 2
c    (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0 ∧  p_180) -> (-b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0)
c  in CNF:
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_2
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨  b^{4, 46}_1
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ -p_180 ∨ -b^{4, 46}_0
c  in DIMACS:
 7688  7689 -7690 -180 -7691 0
 7688  7689 -7690 -180  7692 0
 7688  7689 -7690 -180 -7693 0

c  2+1 --> break 
c    (-b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧  p_180) -> break
c  in CNF:
c     b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 7688 -7689  7690 -180 1162 0


c  2-1 --> 1
c    (-b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧ -p_180) -> (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0)
c  in CNF:
c     b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_2
c     b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_1
c     b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨  b^{4, 46}_0
c  in DIMACS:
 7688 -7689  7690  180 -7691 0
 7688 -7689  7690  180 -7692 0
 7688 -7689  7690  180  7693 0

c  1-1 --> 0
c    (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0 ∧ -p_180) -> (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧ -b^{4, 46}_0)
c  in CNF:
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_2
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_1
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_0
c  in DIMACS:
 7688  7689 -7690  180 -7691 0
 7688  7689 -7690  180 -7692 0
 7688  7689 -7690  180 -7693 0

c  0-1 --> -1
c    (-b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧ -p_180) -> ( b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0)
c  in CNF:
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨  b^{4, 46}_2
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_1
c     b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨  b^{4, 46}_0
c  in DIMACS:
 7688  7689  7690  180  7691 0
 7688  7689  7690  180 -7692 0
 7688  7689  7690  180  7693 0

c  -1-1 --> -2
c    ( b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧  b^{4, 45}_0 ∧ -p_180) -> ( b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0)
c  in CNF:
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨  b^{4, 46}_2
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨  b^{4, 46}_1
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨  p_180 ∨ -b^{4, 46}_0
c  in DIMACS:
-7688  7689 -7690  180  7691 0
-7688  7689 -7690  180  7692 0
-7688  7689 -7690  180 -7693 0

c  -2-1 --> break 
c    ( b^{4, 45}_2 ∧  b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨  b^{4, 45}_0 ∨  p_180 ∨ break
c  in DIMACS:
-7688 -7689  7690  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 45}_2 ∧ -b^{4, 45}_1 ∧ -b^{4, 45}_0 ∧ true) 
c  in CNF:
c    -b^{4, 45}_2 ∨  b^{4, 45}_1 ∨  b^{4, 45}_0 ∨ false 
c  in DIMACS:
-7688  7689  7690  0

c  3 does not represent an automaton state.
c    -(-b^{4, 45}_2 ∧  b^{4, 45}_1 ∧  b^{4, 45}_0 ∧ true) 
c  in CNF:
c     b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ false 
c  in DIMACS:
 7688 -7689 -7690  0
c  -3 does not represent an automaton state.
c    -( b^{4, 45}_2 ∧  b^{4, 45}_1 ∧  b^{4, 45}_0 ∧ true) 
c  in CNF:
c    -b^{4, 45}_2 ∨ -b^{4, 45}_1 ∨ -b^{4, 45}_0 ∨ false 
c  in DIMACS:
-7688 -7689 -7690  0

c i = 46
c  -2+1 --> -1
c    ( b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧  p_184) -> ( b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0)
c  in CNF:
c    -b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨  b^{4, 47}_2
c    -b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_1
c    -b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨  b^{4, 47}_0
c  in DIMACS:
-7691 -7692  7693 -184  7694 0
-7691 -7692  7693 -184 -7695 0
-7691 -7692  7693 -184  7696 0

c  -1+1 --> 0
c    ( b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0 ∧  p_184) -> (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧ -b^{4, 47}_0)
c  in CNF:
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_2
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_1
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_0
c  in DIMACS:
-7691  7692 -7693 -184 -7694 0
-7691  7692 -7693 -184 -7695 0
-7691  7692 -7693 -184 -7696 0

c  0+1 --> 1
c    (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧  p_184) -> (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0)
c  in CNF:
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_2
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_1
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨  b^{4, 47}_0
c  in DIMACS:
 7691  7692  7693 -184 -7694 0
 7691  7692  7693 -184 -7695 0
 7691  7692  7693 -184  7696 0

c  1+1 --> 2
c    (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0 ∧  p_184) -> (-b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0)
c  in CNF:
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_2
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨  b^{4, 47}_1
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ -p_184 ∨ -b^{4, 47}_0
c  in DIMACS:
 7691  7692 -7693 -184 -7694 0
 7691  7692 -7693 -184  7695 0
 7691  7692 -7693 -184 -7696 0

c  2+1 --> break 
c    (-b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧  p_184) -> break
c  in CNF:
c     b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 7691 -7692  7693 -184 1162 0


c  2-1 --> 1
c    (-b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧ -p_184) -> (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0)
c  in CNF:
c     b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_2
c     b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_1
c     b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨  b^{4, 47}_0
c  in DIMACS:
 7691 -7692  7693  184 -7694 0
 7691 -7692  7693  184 -7695 0
 7691 -7692  7693  184  7696 0

c  1-1 --> 0
c    (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0 ∧ -p_184) -> (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧ -b^{4, 47}_0)
c  in CNF:
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_2
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_1
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_0
c  in DIMACS:
 7691  7692 -7693  184 -7694 0
 7691  7692 -7693  184 -7695 0
 7691  7692 -7693  184 -7696 0

c  0-1 --> -1
c    (-b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧ -p_184) -> ( b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0)
c  in CNF:
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨  b^{4, 47}_2
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_1
c     b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨  b^{4, 47}_0
c  in DIMACS:
 7691  7692  7693  184  7694 0
 7691  7692  7693  184 -7695 0
 7691  7692  7693  184  7696 0

c  -1-1 --> -2
c    ( b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧  b^{4, 46}_0 ∧ -p_184) -> ( b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0)
c  in CNF:
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨  b^{4, 47}_2
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨  b^{4, 47}_1
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨  p_184 ∨ -b^{4, 47}_0
c  in DIMACS:
-7691  7692 -7693  184  7694 0
-7691  7692 -7693  184  7695 0
-7691  7692 -7693  184 -7696 0

c  -2-1 --> break 
c    ( b^{4, 46}_2 ∧  b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨  b^{4, 46}_0 ∨  p_184 ∨ break
c  in DIMACS:
-7691 -7692  7693  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 46}_2 ∧ -b^{4, 46}_1 ∧ -b^{4, 46}_0 ∧ true) 
c  in CNF:
c    -b^{4, 46}_2 ∨  b^{4, 46}_1 ∨  b^{4, 46}_0 ∨ false 
c  in DIMACS:
-7691  7692  7693  0

c  3 does not represent an automaton state.
c    -(-b^{4, 46}_2 ∧  b^{4, 46}_1 ∧  b^{4, 46}_0 ∧ true) 
c  in CNF:
c     b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ false 
c  in DIMACS:
 7691 -7692 -7693  0
c  -3 does not represent an automaton state.
c    -( b^{4, 46}_2 ∧  b^{4, 46}_1 ∧  b^{4, 46}_0 ∧ true) 
c  in CNF:
c    -b^{4, 46}_2 ∨ -b^{4, 46}_1 ∨ -b^{4, 46}_0 ∨ false 
c  in DIMACS:
-7691 -7692 -7693  0

c i = 47
c  -2+1 --> -1
c    ( b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧  p_188) -> ( b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0)
c  in CNF:
c    -b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨  b^{4, 48}_2
c    -b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_1
c    -b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨  b^{4, 48}_0
c  in DIMACS:
-7694 -7695  7696 -188  7697 0
-7694 -7695  7696 -188 -7698 0
-7694 -7695  7696 -188  7699 0

c  -1+1 --> 0
c    ( b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0 ∧  p_188) -> (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧ -b^{4, 48}_0)
c  in CNF:
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_2
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_1
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_0
c  in DIMACS:
-7694  7695 -7696 -188 -7697 0
-7694  7695 -7696 -188 -7698 0
-7694  7695 -7696 -188 -7699 0

c  0+1 --> 1
c    (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧  p_188) -> (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0)
c  in CNF:
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_2
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_1
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨  b^{4, 48}_0
c  in DIMACS:
 7694  7695  7696 -188 -7697 0
 7694  7695  7696 -188 -7698 0
 7694  7695  7696 -188  7699 0

c  1+1 --> 2
c    (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0 ∧  p_188) -> (-b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0)
c  in CNF:
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_2
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨  b^{4, 48}_1
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ -p_188 ∨ -b^{4, 48}_0
c  in DIMACS:
 7694  7695 -7696 -188 -7697 0
 7694  7695 -7696 -188  7698 0
 7694  7695 -7696 -188 -7699 0

c  2+1 --> break 
c    (-b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧  p_188) -> break
c  in CNF:
c     b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 7694 -7695  7696 -188 1162 0


c  2-1 --> 1
c    (-b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧ -p_188) -> (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0)
c  in CNF:
c     b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_2
c     b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_1
c     b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨  b^{4, 48}_0
c  in DIMACS:
 7694 -7695  7696  188 -7697 0
 7694 -7695  7696  188 -7698 0
 7694 -7695  7696  188  7699 0

c  1-1 --> 0
c    (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0 ∧ -p_188) -> (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧ -b^{4, 48}_0)
c  in CNF:
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_2
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_1
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_0
c  in DIMACS:
 7694  7695 -7696  188 -7697 0
 7694  7695 -7696  188 -7698 0
 7694  7695 -7696  188 -7699 0

c  0-1 --> -1
c    (-b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧ -p_188) -> ( b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0)
c  in CNF:
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨  b^{4, 48}_2
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_1
c     b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨  b^{4, 48}_0
c  in DIMACS:
 7694  7695  7696  188  7697 0
 7694  7695  7696  188 -7698 0
 7694  7695  7696  188  7699 0

c  -1-1 --> -2
c    ( b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧  b^{4, 47}_0 ∧ -p_188) -> ( b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0)
c  in CNF:
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨  b^{4, 48}_2
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨  b^{4, 48}_1
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨  p_188 ∨ -b^{4, 48}_0
c  in DIMACS:
-7694  7695 -7696  188  7697 0
-7694  7695 -7696  188  7698 0
-7694  7695 -7696  188 -7699 0

c  -2-1 --> break 
c    ( b^{4, 47}_2 ∧  b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨  b^{4, 47}_0 ∨  p_188 ∨ break
c  in DIMACS:
-7694 -7695  7696  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 47}_2 ∧ -b^{4, 47}_1 ∧ -b^{4, 47}_0 ∧ true) 
c  in CNF:
c    -b^{4, 47}_2 ∨  b^{4, 47}_1 ∨  b^{4, 47}_0 ∨ false 
c  in DIMACS:
-7694  7695  7696  0

c  3 does not represent an automaton state.
c    -(-b^{4, 47}_2 ∧  b^{4, 47}_1 ∧  b^{4, 47}_0 ∧ true) 
c  in CNF:
c     b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ false 
c  in DIMACS:
 7694 -7695 -7696  0
c  -3 does not represent an automaton state.
c    -( b^{4, 47}_2 ∧  b^{4, 47}_1 ∧  b^{4, 47}_0 ∧ true) 
c  in CNF:
c    -b^{4, 47}_2 ∨ -b^{4, 47}_1 ∨ -b^{4, 47}_0 ∨ false 
c  in DIMACS:
-7694 -7695 -7696  0

c i = 48
c  -2+1 --> -1
c    ( b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧  p_192) -> ( b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0)
c  in CNF:
c    -b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨  b^{4, 49}_2
c    -b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_1
c    -b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨  b^{4, 49}_0
c  in DIMACS:
-7697 -7698  7699 -192  7700 0
-7697 -7698  7699 -192 -7701 0
-7697 -7698  7699 -192  7702 0

c  -1+1 --> 0
c    ( b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0 ∧  p_192) -> (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧ -b^{4, 49}_0)
c  in CNF:
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_2
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_1
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_0
c  in DIMACS:
-7697  7698 -7699 -192 -7700 0
-7697  7698 -7699 -192 -7701 0
-7697  7698 -7699 -192 -7702 0

c  0+1 --> 1
c    (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧  p_192) -> (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0)
c  in CNF:
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_2
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_1
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨  b^{4, 49}_0
c  in DIMACS:
 7697  7698  7699 -192 -7700 0
 7697  7698  7699 -192 -7701 0
 7697  7698  7699 -192  7702 0

c  1+1 --> 2
c    (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0 ∧  p_192) -> (-b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0)
c  in CNF:
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_2
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨  b^{4, 49}_1
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ -p_192 ∨ -b^{4, 49}_0
c  in DIMACS:
 7697  7698 -7699 -192 -7700 0
 7697  7698 -7699 -192  7701 0
 7697  7698 -7699 -192 -7702 0

c  2+1 --> break 
c    (-b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧  p_192) -> break
c  in CNF:
c     b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 7697 -7698  7699 -192 1162 0


c  2-1 --> 1
c    (-b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧ -p_192) -> (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0)
c  in CNF:
c     b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_2
c     b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_1
c     b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨  b^{4, 49}_0
c  in DIMACS:
 7697 -7698  7699  192 -7700 0
 7697 -7698  7699  192 -7701 0
 7697 -7698  7699  192  7702 0

c  1-1 --> 0
c    (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0 ∧ -p_192) -> (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧ -b^{4, 49}_0)
c  in CNF:
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_2
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_1
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_0
c  in DIMACS:
 7697  7698 -7699  192 -7700 0
 7697  7698 -7699  192 -7701 0
 7697  7698 -7699  192 -7702 0

c  0-1 --> -1
c    (-b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧ -p_192) -> ( b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0)
c  in CNF:
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨  b^{4, 49}_2
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_1
c     b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨  b^{4, 49}_0
c  in DIMACS:
 7697  7698  7699  192  7700 0
 7697  7698  7699  192 -7701 0
 7697  7698  7699  192  7702 0

c  -1-1 --> -2
c    ( b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧  b^{4, 48}_0 ∧ -p_192) -> ( b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0)
c  in CNF:
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨  b^{4, 49}_2
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨  b^{4, 49}_1
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨  p_192 ∨ -b^{4, 49}_0
c  in DIMACS:
-7697  7698 -7699  192  7700 0
-7697  7698 -7699  192  7701 0
-7697  7698 -7699  192 -7702 0

c  -2-1 --> break 
c    ( b^{4, 48}_2 ∧  b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨  b^{4, 48}_0 ∨  p_192 ∨ break
c  in DIMACS:
-7697 -7698  7699  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 48}_2 ∧ -b^{4, 48}_1 ∧ -b^{4, 48}_0 ∧ true) 
c  in CNF:
c    -b^{4, 48}_2 ∨  b^{4, 48}_1 ∨  b^{4, 48}_0 ∨ false 
c  in DIMACS:
-7697  7698  7699  0

c  3 does not represent an automaton state.
c    -(-b^{4, 48}_2 ∧  b^{4, 48}_1 ∧  b^{4, 48}_0 ∧ true) 
c  in CNF:
c     b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ false 
c  in DIMACS:
 7697 -7698 -7699  0
c  -3 does not represent an automaton state.
c    -( b^{4, 48}_2 ∧  b^{4, 48}_1 ∧  b^{4, 48}_0 ∧ true) 
c  in CNF:
c    -b^{4, 48}_2 ∨ -b^{4, 48}_1 ∨ -b^{4, 48}_0 ∨ false 
c  in DIMACS:
-7697 -7698 -7699  0

c i = 49
c  -2+1 --> -1
c    ( b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧  p_196) -> ( b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0)
c  in CNF:
c    -b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨  b^{4, 50}_2
c    -b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_1
c    -b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨  b^{4, 50}_0
c  in DIMACS:
-7700 -7701  7702 -196  7703 0
-7700 -7701  7702 -196 -7704 0
-7700 -7701  7702 -196  7705 0

c  -1+1 --> 0
c    ( b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0 ∧  p_196) -> (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧ -b^{4, 50}_0)
c  in CNF:
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_2
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_1
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_0
c  in DIMACS:
-7700  7701 -7702 -196 -7703 0
-7700  7701 -7702 -196 -7704 0
-7700  7701 -7702 -196 -7705 0

c  0+1 --> 1
c    (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧  p_196) -> (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0)
c  in CNF:
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_2
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_1
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨  b^{4, 50}_0
c  in DIMACS:
 7700  7701  7702 -196 -7703 0
 7700  7701  7702 -196 -7704 0
 7700  7701  7702 -196  7705 0

c  1+1 --> 2
c    (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0 ∧  p_196) -> (-b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0)
c  in CNF:
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_2
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨  b^{4, 50}_1
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ -p_196 ∨ -b^{4, 50}_0
c  in DIMACS:
 7700  7701 -7702 -196 -7703 0
 7700  7701 -7702 -196  7704 0
 7700  7701 -7702 -196 -7705 0

c  2+1 --> break 
c    (-b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧  p_196) -> break
c  in CNF:
c     b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 7700 -7701  7702 -196 1162 0


c  2-1 --> 1
c    (-b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧ -p_196) -> (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0)
c  in CNF:
c     b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_2
c     b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_1
c     b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨  b^{4, 50}_0
c  in DIMACS:
 7700 -7701  7702  196 -7703 0
 7700 -7701  7702  196 -7704 0
 7700 -7701  7702  196  7705 0

c  1-1 --> 0
c    (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0 ∧ -p_196) -> (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧ -b^{4, 50}_0)
c  in CNF:
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_2
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_1
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_0
c  in DIMACS:
 7700  7701 -7702  196 -7703 0
 7700  7701 -7702  196 -7704 0
 7700  7701 -7702  196 -7705 0

c  0-1 --> -1
c    (-b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧ -p_196) -> ( b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0)
c  in CNF:
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨  b^{4, 50}_2
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_1
c     b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨  b^{4, 50}_0
c  in DIMACS:
 7700  7701  7702  196  7703 0
 7700  7701  7702  196 -7704 0
 7700  7701  7702  196  7705 0

c  -1-1 --> -2
c    ( b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧  b^{4, 49}_0 ∧ -p_196) -> ( b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0)
c  in CNF:
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨  b^{4, 50}_2
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨  b^{4, 50}_1
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨  p_196 ∨ -b^{4, 50}_0
c  in DIMACS:
-7700  7701 -7702  196  7703 0
-7700  7701 -7702  196  7704 0
-7700  7701 -7702  196 -7705 0

c  -2-1 --> break 
c    ( b^{4, 49}_2 ∧  b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨  b^{4, 49}_0 ∨  p_196 ∨ break
c  in DIMACS:
-7700 -7701  7702  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 49}_2 ∧ -b^{4, 49}_1 ∧ -b^{4, 49}_0 ∧ true) 
c  in CNF:
c    -b^{4, 49}_2 ∨  b^{4, 49}_1 ∨  b^{4, 49}_0 ∨ false 
c  in DIMACS:
-7700  7701  7702  0

c  3 does not represent an automaton state.
c    -(-b^{4, 49}_2 ∧  b^{4, 49}_1 ∧  b^{4, 49}_0 ∧ true) 
c  in CNF:
c     b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ false 
c  in DIMACS:
 7700 -7701 -7702  0
c  -3 does not represent an automaton state.
c    -( b^{4, 49}_2 ∧  b^{4, 49}_1 ∧  b^{4, 49}_0 ∧ true) 
c  in CNF:
c    -b^{4, 49}_2 ∨ -b^{4, 49}_1 ∨ -b^{4, 49}_0 ∨ false 
c  in DIMACS:
-7700 -7701 -7702  0

c i = 50
c  -2+1 --> -1
c    ( b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧  p_200) -> ( b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0)
c  in CNF:
c    -b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨  b^{4, 51}_2
c    -b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_1
c    -b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨  b^{4, 51}_0
c  in DIMACS:
-7703 -7704  7705 -200  7706 0
-7703 -7704  7705 -200 -7707 0
-7703 -7704  7705 -200  7708 0

c  -1+1 --> 0
c    ( b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0 ∧  p_200) -> (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧ -b^{4, 51}_0)
c  in CNF:
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_2
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_1
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_0
c  in DIMACS:
-7703  7704 -7705 -200 -7706 0
-7703  7704 -7705 -200 -7707 0
-7703  7704 -7705 -200 -7708 0

c  0+1 --> 1
c    (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧  p_200) -> (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0)
c  in CNF:
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_2
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_1
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨  b^{4, 51}_0
c  in DIMACS:
 7703  7704  7705 -200 -7706 0
 7703  7704  7705 -200 -7707 0
 7703  7704  7705 -200  7708 0

c  1+1 --> 2
c    (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0 ∧  p_200) -> (-b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0)
c  in CNF:
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_2
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨  b^{4, 51}_1
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ -p_200 ∨ -b^{4, 51}_0
c  in DIMACS:
 7703  7704 -7705 -200 -7706 0
 7703  7704 -7705 -200  7707 0
 7703  7704 -7705 -200 -7708 0

c  2+1 --> break 
c    (-b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧  p_200) -> break
c  in CNF:
c     b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 7703 -7704  7705 -200 1162 0


c  2-1 --> 1
c    (-b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧ -p_200) -> (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0)
c  in CNF:
c     b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_2
c     b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_1
c     b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨  b^{4, 51}_0
c  in DIMACS:
 7703 -7704  7705  200 -7706 0
 7703 -7704  7705  200 -7707 0
 7703 -7704  7705  200  7708 0

c  1-1 --> 0
c    (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0 ∧ -p_200) -> (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧ -b^{4, 51}_0)
c  in CNF:
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_2
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_1
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_0
c  in DIMACS:
 7703  7704 -7705  200 -7706 0
 7703  7704 -7705  200 -7707 0
 7703  7704 -7705  200 -7708 0

c  0-1 --> -1
c    (-b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧ -p_200) -> ( b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0)
c  in CNF:
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨  b^{4, 51}_2
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_1
c     b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨  b^{4, 51}_0
c  in DIMACS:
 7703  7704  7705  200  7706 0
 7703  7704  7705  200 -7707 0
 7703  7704  7705  200  7708 0

c  -1-1 --> -2
c    ( b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧  b^{4, 50}_0 ∧ -p_200) -> ( b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0)
c  in CNF:
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨  b^{4, 51}_2
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨  b^{4, 51}_1
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨  p_200 ∨ -b^{4, 51}_0
c  in DIMACS:
-7703  7704 -7705  200  7706 0
-7703  7704 -7705  200  7707 0
-7703  7704 -7705  200 -7708 0

c  -2-1 --> break 
c    ( b^{4, 50}_2 ∧  b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨  b^{4, 50}_0 ∨  p_200 ∨ break
c  in DIMACS:
-7703 -7704  7705  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 50}_2 ∧ -b^{4, 50}_1 ∧ -b^{4, 50}_0 ∧ true) 
c  in CNF:
c    -b^{4, 50}_2 ∨  b^{4, 50}_1 ∨  b^{4, 50}_0 ∨ false 
c  in DIMACS:
-7703  7704  7705  0

c  3 does not represent an automaton state.
c    -(-b^{4, 50}_2 ∧  b^{4, 50}_1 ∧  b^{4, 50}_0 ∧ true) 
c  in CNF:
c     b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ false 
c  in DIMACS:
 7703 -7704 -7705  0
c  -3 does not represent an automaton state.
c    -( b^{4, 50}_2 ∧  b^{4, 50}_1 ∧  b^{4, 50}_0 ∧ true) 
c  in CNF:
c    -b^{4, 50}_2 ∨ -b^{4, 50}_1 ∨ -b^{4, 50}_0 ∨ false 
c  in DIMACS:
-7703 -7704 -7705  0

c i = 51
c  -2+1 --> -1
c    ( b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧  p_204) -> ( b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0)
c  in CNF:
c    -b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨  b^{4, 52}_2
c    -b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_1
c    -b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨  b^{4, 52}_0
c  in DIMACS:
-7706 -7707  7708 -204  7709 0
-7706 -7707  7708 -204 -7710 0
-7706 -7707  7708 -204  7711 0

c  -1+1 --> 0
c    ( b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0 ∧  p_204) -> (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧ -b^{4, 52}_0)
c  in CNF:
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_2
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_1
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_0
c  in DIMACS:
-7706  7707 -7708 -204 -7709 0
-7706  7707 -7708 -204 -7710 0
-7706  7707 -7708 -204 -7711 0

c  0+1 --> 1
c    (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧  p_204) -> (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0)
c  in CNF:
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_2
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_1
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨  b^{4, 52}_0
c  in DIMACS:
 7706  7707  7708 -204 -7709 0
 7706  7707  7708 -204 -7710 0
 7706  7707  7708 -204  7711 0

c  1+1 --> 2
c    (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0 ∧  p_204) -> (-b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0)
c  in CNF:
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_2
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨  b^{4, 52}_1
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ -p_204 ∨ -b^{4, 52}_0
c  in DIMACS:
 7706  7707 -7708 -204 -7709 0
 7706  7707 -7708 -204  7710 0
 7706  7707 -7708 -204 -7711 0

c  2+1 --> break 
c    (-b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧  p_204) -> break
c  in CNF:
c     b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 7706 -7707  7708 -204 1162 0


c  2-1 --> 1
c    (-b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧ -p_204) -> (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0)
c  in CNF:
c     b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_2
c     b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_1
c     b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨  b^{4, 52}_0
c  in DIMACS:
 7706 -7707  7708  204 -7709 0
 7706 -7707  7708  204 -7710 0
 7706 -7707  7708  204  7711 0

c  1-1 --> 0
c    (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0 ∧ -p_204) -> (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧ -b^{4, 52}_0)
c  in CNF:
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_2
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_1
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_0
c  in DIMACS:
 7706  7707 -7708  204 -7709 0
 7706  7707 -7708  204 -7710 0
 7706  7707 -7708  204 -7711 0

c  0-1 --> -1
c    (-b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧ -p_204) -> ( b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0)
c  in CNF:
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨  b^{4, 52}_2
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_1
c     b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨  b^{4, 52}_0
c  in DIMACS:
 7706  7707  7708  204  7709 0
 7706  7707  7708  204 -7710 0
 7706  7707  7708  204  7711 0

c  -1-1 --> -2
c    ( b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧  b^{4, 51}_0 ∧ -p_204) -> ( b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0)
c  in CNF:
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨  b^{4, 52}_2
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨  b^{4, 52}_1
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨  p_204 ∨ -b^{4, 52}_0
c  in DIMACS:
-7706  7707 -7708  204  7709 0
-7706  7707 -7708  204  7710 0
-7706  7707 -7708  204 -7711 0

c  -2-1 --> break 
c    ( b^{4, 51}_2 ∧  b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨  b^{4, 51}_0 ∨  p_204 ∨ break
c  in DIMACS:
-7706 -7707  7708  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 51}_2 ∧ -b^{4, 51}_1 ∧ -b^{4, 51}_0 ∧ true) 
c  in CNF:
c    -b^{4, 51}_2 ∨  b^{4, 51}_1 ∨  b^{4, 51}_0 ∨ false 
c  in DIMACS:
-7706  7707  7708  0

c  3 does not represent an automaton state.
c    -(-b^{4, 51}_2 ∧  b^{4, 51}_1 ∧  b^{4, 51}_0 ∧ true) 
c  in CNF:
c     b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ false 
c  in DIMACS:
 7706 -7707 -7708  0
c  -3 does not represent an automaton state.
c    -( b^{4, 51}_2 ∧  b^{4, 51}_1 ∧  b^{4, 51}_0 ∧ true) 
c  in CNF:
c    -b^{4, 51}_2 ∨ -b^{4, 51}_1 ∨ -b^{4, 51}_0 ∨ false 
c  in DIMACS:
-7706 -7707 -7708  0

c i = 52
c  -2+1 --> -1
c    ( b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧  p_208) -> ( b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0)
c  in CNF:
c    -b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨  b^{4, 53}_2
c    -b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_1
c    -b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨  b^{4, 53}_0
c  in DIMACS:
-7709 -7710  7711 -208  7712 0
-7709 -7710  7711 -208 -7713 0
-7709 -7710  7711 -208  7714 0

c  -1+1 --> 0
c    ( b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0 ∧  p_208) -> (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧ -b^{4, 53}_0)
c  in CNF:
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_2
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_1
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_0
c  in DIMACS:
-7709  7710 -7711 -208 -7712 0
-7709  7710 -7711 -208 -7713 0
-7709  7710 -7711 -208 -7714 0

c  0+1 --> 1
c    (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧  p_208) -> (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0)
c  in CNF:
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_2
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_1
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨  b^{4, 53}_0
c  in DIMACS:
 7709  7710  7711 -208 -7712 0
 7709  7710  7711 -208 -7713 0
 7709  7710  7711 -208  7714 0

c  1+1 --> 2
c    (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0 ∧  p_208) -> (-b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0)
c  in CNF:
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_2
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨  b^{4, 53}_1
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ -p_208 ∨ -b^{4, 53}_0
c  in DIMACS:
 7709  7710 -7711 -208 -7712 0
 7709  7710 -7711 -208  7713 0
 7709  7710 -7711 -208 -7714 0

c  2+1 --> break 
c    (-b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧  p_208) -> break
c  in CNF:
c     b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 7709 -7710  7711 -208 1162 0


c  2-1 --> 1
c    (-b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧ -p_208) -> (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0)
c  in CNF:
c     b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_2
c     b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_1
c     b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨  b^{4, 53}_0
c  in DIMACS:
 7709 -7710  7711  208 -7712 0
 7709 -7710  7711  208 -7713 0
 7709 -7710  7711  208  7714 0

c  1-1 --> 0
c    (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0 ∧ -p_208) -> (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧ -b^{4, 53}_0)
c  in CNF:
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_2
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_1
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_0
c  in DIMACS:
 7709  7710 -7711  208 -7712 0
 7709  7710 -7711  208 -7713 0
 7709  7710 -7711  208 -7714 0

c  0-1 --> -1
c    (-b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧ -p_208) -> ( b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0)
c  in CNF:
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨  b^{4, 53}_2
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_1
c     b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨  b^{4, 53}_0
c  in DIMACS:
 7709  7710  7711  208  7712 0
 7709  7710  7711  208 -7713 0
 7709  7710  7711  208  7714 0

c  -1-1 --> -2
c    ( b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧  b^{4, 52}_0 ∧ -p_208) -> ( b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0)
c  in CNF:
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨  b^{4, 53}_2
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨  b^{4, 53}_1
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨  p_208 ∨ -b^{4, 53}_0
c  in DIMACS:
-7709  7710 -7711  208  7712 0
-7709  7710 -7711  208  7713 0
-7709  7710 -7711  208 -7714 0

c  -2-1 --> break 
c    ( b^{4, 52}_2 ∧  b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨  b^{4, 52}_0 ∨  p_208 ∨ break
c  in DIMACS:
-7709 -7710  7711  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 52}_2 ∧ -b^{4, 52}_1 ∧ -b^{4, 52}_0 ∧ true) 
c  in CNF:
c    -b^{4, 52}_2 ∨  b^{4, 52}_1 ∨  b^{4, 52}_0 ∨ false 
c  in DIMACS:
-7709  7710  7711  0

c  3 does not represent an automaton state.
c    -(-b^{4, 52}_2 ∧  b^{4, 52}_1 ∧  b^{4, 52}_0 ∧ true) 
c  in CNF:
c     b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ false 
c  in DIMACS:
 7709 -7710 -7711  0
c  -3 does not represent an automaton state.
c    -( b^{4, 52}_2 ∧  b^{4, 52}_1 ∧  b^{4, 52}_0 ∧ true) 
c  in CNF:
c    -b^{4, 52}_2 ∨ -b^{4, 52}_1 ∨ -b^{4, 52}_0 ∨ false 
c  in DIMACS:
-7709 -7710 -7711  0

c i = 53
c  -2+1 --> -1
c    ( b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧  p_212) -> ( b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0)
c  in CNF:
c    -b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨  b^{4, 54}_2
c    -b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_1
c    -b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨  b^{4, 54}_0
c  in DIMACS:
-7712 -7713  7714 -212  7715 0
-7712 -7713  7714 -212 -7716 0
-7712 -7713  7714 -212  7717 0

c  -1+1 --> 0
c    ( b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0 ∧  p_212) -> (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧ -b^{4, 54}_0)
c  in CNF:
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_2
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_1
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_0
c  in DIMACS:
-7712  7713 -7714 -212 -7715 0
-7712  7713 -7714 -212 -7716 0
-7712  7713 -7714 -212 -7717 0

c  0+1 --> 1
c    (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧  p_212) -> (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0)
c  in CNF:
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_2
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_1
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨  b^{4, 54}_0
c  in DIMACS:
 7712  7713  7714 -212 -7715 0
 7712  7713  7714 -212 -7716 0
 7712  7713  7714 -212  7717 0

c  1+1 --> 2
c    (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0 ∧  p_212) -> (-b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0)
c  in CNF:
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_2
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨  b^{4, 54}_1
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ -p_212 ∨ -b^{4, 54}_0
c  in DIMACS:
 7712  7713 -7714 -212 -7715 0
 7712  7713 -7714 -212  7716 0
 7712  7713 -7714 -212 -7717 0

c  2+1 --> break 
c    (-b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧  p_212) -> break
c  in CNF:
c     b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 7712 -7713  7714 -212 1162 0


c  2-1 --> 1
c    (-b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧ -p_212) -> (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0)
c  in CNF:
c     b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_2
c     b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_1
c     b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨  b^{4, 54}_0
c  in DIMACS:
 7712 -7713  7714  212 -7715 0
 7712 -7713  7714  212 -7716 0
 7712 -7713  7714  212  7717 0

c  1-1 --> 0
c    (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0 ∧ -p_212) -> (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧ -b^{4, 54}_0)
c  in CNF:
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_2
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_1
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_0
c  in DIMACS:
 7712  7713 -7714  212 -7715 0
 7712  7713 -7714  212 -7716 0
 7712  7713 -7714  212 -7717 0

c  0-1 --> -1
c    (-b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧ -p_212) -> ( b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0)
c  in CNF:
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨  b^{4, 54}_2
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_1
c     b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨  b^{4, 54}_0
c  in DIMACS:
 7712  7713  7714  212  7715 0
 7712  7713  7714  212 -7716 0
 7712  7713  7714  212  7717 0

c  -1-1 --> -2
c    ( b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧  b^{4, 53}_0 ∧ -p_212) -> ( b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0)
c  in CNF:
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨  b^{4, 54}_2
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨  b^{4, 54}_1
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨  p_212 ∨ -b^{4, 54}_0
c  in DIMACS:
-7712  7713 -7714  212  7715 0
-7712  7713 -7714  212  7716 0
-7712  7713 -7714  212 -7717 0

c  -2-1 --> break 
c    ( b^{4, 53}_2 ∧  b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨  b^{4, 53}_0 ∨  p_212 ∨ break
c  in DIMACS:
-7712 -7713  7714  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 53}_2 ∧ -b^{4, 53}_1 ∧ -b^{4, 53}_0 ∧ true) 
c  in CNF:
c    -b^{4, 53}_2 ∨  b^{4, 53}_1 ∨  b^{4, 53}_0 ∨ false 
c  in DIMACS:
-7712  7713  7714  0

c  3 does not represent an automaton state.
c    -(-b^{4, 53}_2 ∧  b^{4, 53}_1 ∧  b^{4, 53}_0 ∧ true) 
c  in CNF:
c     b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ false 
c  in DIMACS:
 7712 -7713 -7714  0
c  -3 does not represent an automaton state.
c    -( b^{4, 53}_2 ∧  b^{4, 53}_1 ∧  b^{4, 53}_0 ∧ true) 
c  in CNF:
c    -b^{4, 53}_2 ∨ -b^{4, 53}_1 ∨ -b^{4, 53}_0 ∨ false 
c  in DIMACS:
-7712 -7713 -7714  0

c i = 54
c  -2+1 --> -1
c    ( b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧  p_216) -> ( b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0)
c  in CNF:
c    -b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨  b^{4, 55}_2
c    -b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_1
c    -b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨  b^{4, 55}_0
c  in DIMACS:
-7715 -7716  7717 -216  7718 0
-7715 -7716  7717 -216 -7719 0
-7715 -7716  7717 -216  7720 0

c  -1+1 --> 0
c    ( b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0 ∧  p_216) -> (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧ -b^{4, 55}_0)
c  in CNF:
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_2
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_1
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_0
c  in DIMACS:
-7715  7716 -7717 -216 -7718 0
-7715  7716 -7717 -216 -7719 0
-7715  7716 -7717 -216 -7720 0

c  0+1 --> 1
c    (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧  p_216) -> (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0)
c  in CNF:
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_2
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_1
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨  b^{4, 55}_0
c  in DIMACS:
 7715  7716  7717 -216 -7718 0
 7715  7716  7717 -216 -7719 0
 7715  7716  7717 -216  7720 0

c  1+1 --> 2
c    (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0 ∧  p_216) -> (-b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0)
c  in CNF:
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_2
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨  b^{4, 55}_1
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ -p_216 ∨ -b^{4, 55}_0
c  in DIMACS:
 7715  7716 -7717 -216 -7718 0
 7715  7716 -7717 -216  7719 0
 7715  7716 -7717 -216 -7720 0

c  2+1 --> break 
c    (-b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧  p_216) -> break
c  in CNF:
c     b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 7715 -7716  7717 -216 1162 0


c  2-1 --> 1
c    (-b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧ -p_216) -> (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0)
c  in CNF:
c     b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_2
c     b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_1
c     b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨  b^{4, 55}_0
c  in DIMACS:
 7715 -7716  7717  216 -7718 0
 7715 -7716  7717  216 -7719 0
 7715 -7716  7717  216  7720 0

c  1-1 --> 0
c    (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0 ∧ -p_216) -> (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧ -b^{4, 55}_0)
c  in CNF:
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_2
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_1
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_0
c  in DIMACS:
 7715  7716 -7717  216 -7718 0
 7715  7716 -7717  216 -7719 0
 7715  7716 -7717  216 -7720 0

c  0-1 --> -1
c    (-b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧ -p_216) -> ( b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0)
c  in CNF:
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨  b^{4, 55}_2
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_1
c     b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨  b^{4, 55}_0
c  in DIMACS:
 7715  7716  7717  216  7718 0
 7715  7716  7717  216 -7719 0
 7715  7716  7717  216  7720 0

c  -1-1 --> -2
c    ( b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧  b^{4, 54}_0 ∧ -p_216) -> ( b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0)
c  in CNF:
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨  b^{4, 55}_2
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨  b^{4, 55}_1
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨  p_216 ∨ -b^{4, 55}_0
c  in DIMACS:
-7715  7716 -7717  216  7718 0
-7715  7716 -7717  216  7719 0
-7715  7716 -7717  216 -7720 0

c  -2-1 --> break 
c    ( b^{4, 54}_2 ∧  b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨  b^{4, 54}_0 ∨  p_216 ∨ break
c  in DIMACS:
-7715 -7716  7717  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 54}_2 ∧ -b^{4, 54}_1 ∧ -b^{4, 54}_0 ∧ true) 
c  in CNF:
c    -b^{4, 54}_2 ∨  b^{4, 54}_1 ∨  b^{4, 54}_0 ∨ false 
c  in DIMACS:
-7715  7716  7717  0

c  3 does not represent an automaton state.
c    -(-b^{4, 54}_2 ∧  b^{4, 54}_1 ∧  b^{4, 54}_0 ∧ true) 
c  in CNF:
c     b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ false 
c  in DIMACS:
 7715 -7716 -7717  0
c  -3 does not represent an automaton state.
c    -( b^{4, 54}_2 ∧  b^{4, 54}_1 ∧  b^{4, 54}_0 ∧ true) 
c  in CNF:
c    -b^{4, 54}_2 ∨ -b^{4, 54}_1 ∨ -b^{4, 54}_0 ∨ false 
c  in DIMACS:
-7715 -7716 -7717  0

c i = 55
c  -2+1 --> -1
c    ( b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧  p_220) -> ( b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0)
c  in CNF:
c    -b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨  b^{4, 56}_2
c    -b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_1
c    -b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨  b^{4, 56}_0
c  in DIMACS:
-7718 -7719  7720 -220  7721 0
-7718 -7719  7720 -220 -7722 0
-7718 -7719  7720 -220  7723 0

c  -1+1 --> 0
c    ( b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0 ∧  p_220) -> (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧ -b^{4, 56}_0)
c  in CNF:
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_2
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_1
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_0
c  in DIMACS:
-7718  7719 -7720 -220 -7721 0
-7718  7719 -7720 -220 -7722 0
-7718  7719 -7720 -220 -7723 0

c  0+1 --> 1
c    (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧  p_220) -> (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0)
c  in CNF:
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_2
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_1
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨  b^{4, 56}_0
c  in DIMACS:
 7718  7719  7720 -220 -7721 0
 7718  7719  7720 -220 -7722 0
 7718  7719  7720 -220  7723 0

c  1+1 --> 2
c    (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0 ∧  p_220) -> (-b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0)
c  in CNF:
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_2
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨  b^{4, 56}_1
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ -p_220 ∨ -b^{4, 56}_0
c  in DIMACS:
 7718  7719 -7720 -220 -7721 0
 7718  7719 -7720 -220  7722 0
 7718  7719 -7720 -220 -7723 0

c  2+1 --> break 
c    (-b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧  p_220) -> break
c  in CNF:
c     b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 7718 -7719  7720 -220 1162 0


c  2-1 --> 1
c    (-b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧ -p_220) -> (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0)
c  in CNF:
c     b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_2
c     b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_1
c     b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨  b^{4, 56}_0
c  in DIMACS:
 7718 -7719  7720  220 -7721 0
 7718 -7719  7720  220 -7722 0
 7718 -7719  7720  220  7723 0

c  1-1 --> 0
c    (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0 ∧ -p_220) -> (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧ -b^{4, 56}_0)
c  in CNF:
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_2
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_1
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_0
c  in DIMACS:
 7718  7719 -7720  220 -7721 0
 7718  7719 -7720  220 -7722 0
 7718  7719 -7720  220 -7723 0

c  0-1 --> -1
c    (-b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧ -p_220) -> ( b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0)
c  in CNF:
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨  b^{4, 56}_2
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_1
c     b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨  b^{4, 56}_0
c  in DIMACS:
 7718  7719  7720  220  7721 0
 7718  7719  7720  220 -7722 0
 7718  7719  7720  220  7723 0

c  -1-1 --> -2
c    ( b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧  b^{4, 55}_0 ∧ -p_220) -> ( b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0)
c  in CNF:
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨  b^{4, 56}_2
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨  b^{4, 56}_1
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨  p_220 ∨ -b^{4, 56}_0
c  in DIMACS:
-7718  7719 -7720  220  7721 0
-7718  7719 -7720  220  7722 0
-7718  7719 -7720  220 -7723 0

c  -2-1 --> break 
c    ( b^{4, 55}_2 ∧  b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨  b^{4, 55}_0 ∨  p_220 ∨ break
c  in DIMACS:
-7718 -7719  7720  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 55}_2 ∧ -b^{4, 55}_1 ∧ -b^{4, 55}_0 ∧ true) 
c  in CNF:
c    -b^{4, 55}_2 ∨  b^{4, 55}_1 ∨  b^{4, 55}_0 ∨ false 
c  in DIMACS:
-7718  7719  7720  0

c  3 does not represent an automaton state.
c    -(-b^{4, 55}_2 ∧  b^{4, 55}_1 ∧  b^{4, 55}_0 ∧ true) 
c  in CNF:
c     b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ false 
c  in DIMACS:
 7718 -7719 -7720  0
c  -3 does not represent an automaton state.
c    -( b^{4, 55}_2 ∧  b^{4, 55}_1 ∧  b^{4, 55}_0 ∧ true) 
c  in CNF:
c    -b^{4, 55}_2 ∨ -b^{4, 55}_1 ∨ -b^{4, 55}_0 ∨ false 
c  in DIMACS:
-7718 -7719 -7720  0

c i = 56
c  -2+1 --> -1
c    ( b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧  p_224) -> ( b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0)
c  in CNF:
c    -b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨  b^{4, 57}_2
c    -b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_1
c    -b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨  b^{4, 57}_0
c  in DIMACS:
-7721 -7722  7723 -224  7724 0
-7721 -7722  7723 -224 -7725 0
-7721 -7722  7723 -224  7726 0

c  -1+1 --> 0
c    ( b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0 ∧  p_224) -> (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧ -b^{4, 57}_0)
c  in CNF:
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_2
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_1
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_0
c  in DIMACS:
-7721  7722 -7723 -224 -7724 0
-7721  7722 -7723 -224 -7725 0
-7721  7722 -7723 -224 -7726 0

c  0+1 --> 1
c    (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧  p_224) -> (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0)
c  in CNF:
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_2
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_1
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨  b^{4, 57}_0
c  in DIMACS:
 7721  7722  7723 -224 -7724 0
 7721  7722  7723 -224 -7725 0
 7721  7722  7723 -224  7726 0

c  1+1 --> 2
c    (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0 ∧  p_224) -> (-b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0)
c  in CNF:
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_2
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨  b^{4, 57}_1
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ -p_224 ∨ -b^{4, 57}_0
c  in DIMACS:
 7721  7722 -7723 -224 -7724 0
 7721  7722 -7723 -224  7725 0
 7721  7722 -7723 -224 -7726 0

c  2+1 --> break 
c    (-b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧  p_224) -> break
c  in CNF:
c     b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 7721 -7722  7723 -224 1162 0


c  2-1 --> 1
c    (-b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧ -p_224) -> (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0)
c  in CNF:
c     b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_2
c     b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_1
c     b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨  b^{4, 57}_0
c  in DIMACS:
 7721 -7722  7723  224 -7724 0
 7721 -7722  7723  224 -7725 0
 7721 -7722  7723  224  7726 0

c  1-1 --> 0
c    (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0 ∧ -p_224) -> (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧ -b^{4, 57}_0)
c  in CNF:
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_2
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_1
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_0
c  in DIMACS:
 7721  7722 -7723  224 -7724 0
 7721  7722 -7723  224 -7725 0
 7721  7722 -7723  224 -7726 0

c  0-1 --> -1
c    (-b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧ -p_224) -> ( b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0)
c  in CNF:
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨  b^{4, 57}_2
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_1
c     b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨  b^{4, 57}_0
c  in DIMACS:
 7721  7722  7723  224  7724 0
 7721  7722  7723  224 -7725 0
 7721  7722  7723  224  7726 0

c  -1-1 --> -2
c    ( b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧  b^{4, 56}_0 ∧ -p_224) -> ( b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0)
c  in CNF:
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨  b^{4, 57}_2
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨  b^{4, 57}_1
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨  p_224 ∨ -b^{4, 57}_0
c  in DIMACS:
-7721  7722 -7723  224  7724 0
-7721  7722 -7723  224  7725 0
-7721  7722 -7723  224 -7726 0

c  -2-1 --> break 
c    ( b^{4, 56}_2 ∧  b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨  b^{4, 56}_0 ∨  p_224 ∨ break
c  in DIMACS:
-7721 -7722  7723  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 56}_2 ∧ -b^{4, 56}_1 ∧ -b^{4, 56}_0 ∧ true) 
c  in CNF:
c    -b^{4, 56}_2 ∨  b^{4, 56}_1 ∨  b^{4, 56}_0 ∨ false 
c  in DIMACS:
-7721  7722  7723  0

c  3 does not represent an automaton state.
c    -(-b^{4, 56}_2 ∧  b^{4, 56}_1 ∧  b^{4, 56}_0 ∧ true) 
c  in CNF:
c     b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ false 
c  in DIMACS:
 7721 -7722 -7723  0
c  -3 does not represent an automaton state.
c    -( b^{4, 56}_2 ∧  b^{4, 56}_1 ∧  b^{4, 56}_0 ∧ true) 
c  in CNF:
c    -b^{4, 56}_2 ∨ -b^{4, 56}_1 ∨ -b^{4, 56}_0 ∨ false 
c  in DIMACS:
-7721 -7722 -7723  0

c i = 57
c  -2+1 --> -1
c    ( b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧  p_228) -> ( b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0)
c  in CNF:
c    -b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨  b^{4, 58}_2
c    -b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_1
c    -b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨  b^{4, 58}_0
c  in DIMACS:
-7724 -7725  7726 -228  7727 0
-7724 -7725  7726 -228 -7728 0
-7724 -7725  7726 -228  7729 0

c  -1+1 --> 0
c    ( b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0 ∧  p_228) -> (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧ -b^{4, 58}_0)
c  in CNF:
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_2
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_1
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_0
c  in DIMACS:
-7724  7725 -7726 -228 -7727 0
-7724  7725 -7726 -228 -7728 0
-7724  7725 -7726 -228 -7729 0

c  0+1 --> 1
c    (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧  p_228) -> (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0)
c  in CNF:
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_2
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_1
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨  b^{4, 58}_0
c  in DIMACS:
 7724  7725  7726 -228 -7727 0
 7724  7725  7726 -228 -7728 0
 7724  7725  7726 -228  7729 0

c  1+1 --> 2
c    (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0 ∧  p_228) -> (-b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0)
c  in CNF:
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_2
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨  b^{4, 58}_1
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ -p_228 ∨ -b^{4, 58}_0
c  in DIMACS:
 7724  7725 -7726 -228 -7727 0
 7724  7725 -7726 -228  7728 0
 7724  7725 -7726 -228 -7729 0

c  2+1 --> break 
c    (-b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧  p_228) -> break
c  in CNF:
c     b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 7724 -7725  7726 -228 1162 0


c  2-1 --> 1
c    (-b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧ -p_228) -> (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0)
c  in CNF:
c     b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_2
c     b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_1
c     b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨  b^{4, 58}_0
c  in DIMACS:
 7724 -7725  7726  228 -7727 0
 7724 -7725  7726  228 -7728 0
 7724 -7725  7726  228  7729 0

c  1-1 --> 0
c    (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0 ∧ -p_228) -> (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧ -b^{4, 58}_0)
c  in CNF:
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_2
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_1
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_0
c  in DIMACS:
 7724  7725 -7726  228 -7727 0
 7724  7725 -7726  228 -7728 0
 7724  7725 -7726  228 -7729 0

c  0-1 --> -1
c    (-b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧ -p_228) -> ( b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0)
c  in CNF:
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨  b^{4, 58}_2
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_1
c     b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨  b^{4, 58}_0
c  in DIMACS:
 7724  7725  7726  228  7727 0
 7724  7725  7726  228 -7728 0
 7724  7725  7726  228  7729 0

c  -1-1 --> -2
c    ( b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧  b^{4, 57}_0 ∧ -p_228) -> ( b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0)
c  in CNF:
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨  b^{4, 58}_2
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨  b^{4, 58}_1
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨  p_228 ∨ -b^{4, 58}_0
c  in DIMACS:
-7724  7725 -7726  228  7727 0
-7724  7725 -7726  228  7728 0
-7724  7725 -7726  228 -7729 0

c  -2-1 --> break 
c    ( b^{4, 57}_2 ∧  b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨  b^{4, 57}_0 ∨  p_228 ∨ break
c  in DIMACS:
-7724 -7725  7726  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 57}_2 ∧ -b^{4, 57}_1 ∧ -b^{4, 57}_0 ∧ true) 
c  in CNF:
c    -b^{4, 57}_2 ∨  b^{4, 57}_1 ∨  b^{4, 57}_0 ∨ false 
c  in DIMACS:
-7724  7725  7726  0

c  3 does not represent an automaton state.
c    -(-b^{4, 57}_2 ∧  b^{4, 57}_1 ∧  b^{4, 57}_0 ∧ true) 
c  in CNF:
c     b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ false 
c  in DIMACS:
 7724 -7725 -7726  0
c  -3 does not represent an automaton state.
c    -( b^{4, 57}_2 ∧  b^{4, 57}_1 ∧  b^{4, 57}_0 ∧ true) 
c  in CNF:
c    -b^{4, 57}_2 ∨ -b^{4, 57}_1 ∨ -b^{4, 57}_0 ∨ false 
c  in DIMACS:
-7724 -7725 -7726  0

c i = 58
c  -2+1 --> -1
c    ( b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧  p_232) -> ( b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0)
c  in CNF:
c    -b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨  b^{4, 59}_2
c    -b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_1
c    -b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨  b^{4, 59}_0
c  in DIMACS:
-7727 -7728  7729 -232  7730 0
-7727 -7728  7729 -232 -7731 0
-7727 -7728  7729 -232  7732 0

c  -1+1 --> 0
c    ( b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0 ∧  p_232) -> (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧ -b^{4, 59}_0)
c  in CNF:
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_2
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_1
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_0
c  in DIMACS:
-7727  7728 -7729 -232 -7730 0
-7727  7728 -7729 -232 -7731 0
-7727  7728 -7729 -232 -7732 0

c  0+1 --> 1
c    (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧  p_232) -> (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0)
c  in CNF:
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_2
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_1
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨  b^{4, 59}_0
c  in DIMACS:
 7727  7728  7729 -232 -7730 0
 7727  7728  7729 -232 -7731 0
 7727  7728  7729 -232  7732 0

c  1+1 --> 2
c    (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0 ∧  p_232) -> (-b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0)
c  in CNF:
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_2
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨  b^{4, 59}_1
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ -p_232 ∨ -b^{4, 59}_0
c  in DIMACS:
 7727  7728 -7729 -232 -7730 0
 7727  7728 -7729 -232  7731 0
 7727  7728 -7729 -232 -7732 0

c  2+1 --> break 
c    (-b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧  p_232) -> break
c  in CNF:
c     b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 7727 -7728  7729 -232 1162 0


c  2-1 --> 1
c    (-b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧ -p_232) -> (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0)
c  in CNF:
c     b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_2
c     b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_1
c     b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨  b^{4, 59}_0
c  in DIMACS:
 7727 -7728  7729  232 -7730 0
 7727 -7728  7729  232 -7731 0
 7727 -7728  7729  232  7732 0

c  1-1 --> 0
c    (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0 ∧ -p_232) -> (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧ -b^{4, 59}_0)
c  in CNF:
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_2
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_1
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_0
c  in DIMACS:
 7727  7728 -7729  232 -7730 0
 7727  7728 -7729  232 -7731 0
 7727  7728 -7729  232 -7732 0

c  0-1 --> -1
c    (-b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧ -p_232) -> ( b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0)
c  in CNF:
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨  b^{4, 59}_2
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_1
c     b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨  b^{4, 59}_0
c  in DIMACS:
 7727  7728  7729  232  7730 0
 7727  7728  7729  232 -7731 0
 7727  7728  7729  232  7732 0

c  -1-1 --> -2
c    ( b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧  b^{4, 58}_0 ∧ -p_232) -> ( b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0)
c  in CNF:
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨  b^{4, 59}_2
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨  b^{4, 59}_1
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨  p_232 ∨ -b^{4, 59}_0
c  in DIMACS:
-7727  7728 -7729  232  7730 0
-7727  7728 -7729  232  7731 0
-7727  7728 -7729  232 -7732 0

c  -2-1 --> break 
c    ( b^{4, 58}_2 ∧  b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨  b^{4, 58}_0 ∨  p_232 ∨ break
c  in DIMACS:
-7727 -7728  7729  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 58}_2 ∧ -b^{4, 58}_1 ∧ -b^{4, 58}_0 ∧ true) 
c  in CNF:
c    -b^{4, 58}_2 ∨  b^{4, 58}_1 ∨  b^{4, 58}_0 ∨ false 
c  in DIMACS:
-7727  7728  7729  0

c  3 does not represent an automaton state.
c    -(-b^{4, 58}_2 ∧  b^{4, 58}_1 ∧  b^{4, 58}_0 ∧ true) 
c  in CNF:
c     b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ false 
c  in DIMACS:
 7727 -7728 -7729  0
c  -3 does not represent an automaton state.
c    -( b^{4, 58}_2 ∧  b^{4, 58}_1 ∧  b^{4, 58}_0 ∧ true) 
c  in CNF:
c    -b^{4, 58}_2 ∨ -b^{4, 58}_1 ∨ -b^{4, 58}_0 ∨ false 
c  in DIMACS:
-7727 -7728 -7729  0

c i = 59
c  -2+1 --> -1
c    ( b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧  p_236) -> ( b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0)
c  in CNF:
c    -b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨  b^{4, 60}_2
c    -b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_1
c    -b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨  b^{4, 60}_0
c  in DIMACS:
-7730 -7731  7732 -236  7733 0
-7730 -7731  7732 -236 -7734 0
-7730 -7731  7732 -236  7735 0

c  -1+1 --> 0
c    ( b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0 ∧  p_236) -> (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧ -b^{4, 60}_0)
c  in CNF:
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_2
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_1
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_0
c  in DIMACS:
-7730  7731 -7732 -236 -7733 0
-7730  7731 -7732 -236 -7734 0
-7730  7731 -7732 -236 -7735 0

c  0+1 --> 1
c    (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧  p_236) -> (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0)
c  in CNF:
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_2
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_1
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨  b^{4, 60}_0
c  in DIMACS:
 7730  7731  7732 -236 -7733 0
 7730  7731  7732 -236 -7734 0
 7730  7731  7732 -236  7735 0

c  1+1 --> 2
c    (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0 ∧  p_236) -> (-b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0)
c  in CNF:
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_2
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨  b^{4, 60}_1
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ -p_236 ∨ -b^{4, 60}_0
c  in DIMACS:
 7730  7731 -7732 -236 -7733 0
 7730  7731 -7732 -236  7734 0
 7730  7731 -7732 -236 -7735 0

c  2+1 --> break 
c    (-b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧  p_236) -> break
c  in CNF:
c     b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 7730 -7731  7732 -236 1162 0


c  2-1 --> 1
c    (-b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧ -p_236) -> (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0)
c  in CNF:
c     b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_2
c     b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_1
c     b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨  b^{4, 60}_0
c  in DIMACS:
 7730 -7731  7732  236 -7733 0
 7730 -7731  7732  236 -7734 0
 7730 -7731  7732  236  7735 0

c  1-1 --> 0
c    (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0 ∧ -p_236) -> (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧ -b^{4, 60}_0)
c  in CNF:
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_2
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_1
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_0
c  in DIMACS:
 7730  7731 -7732  236 -7733 0
 7730  7731 -7732  236 -7734 0
 7730  7731 -7732  236 -7735 0

c  0-1 --> -1
c    (-b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧ -p_236) -> ( b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0)
c  in CNF:
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨  b^{4, 60}_2
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_1
c     b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨  b^{4, 60}_0
c  in DIMACS:
 7730  7731  7732  236  7733 0
 7730  7731  7732  236 -7734 0
 7730  7731  7732  236  7735 0

c  -1-1 --> -2
c    ( b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧  b^{4, 59}_0 ∧ -p_236) -> ( b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0)
c  in CNF:
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨  b^{4, 60}_2
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨  b^{4, 60}_1
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨  p_236 ∨ -b^{4, 60}_0
c  in DIMACS:
-7730  7731 -7732  236  7733 0
-7730  7731 -7732  236  7734 0
-7730  7731 -7732  236 -7735 0

c  -2-1 --> break 
c    ( b^{4, 59}_2 ∧  b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨  b^{4, 59}_0 ∨  p_236 ∨ break
c  in DIMACS:
-7730 -7731  7732  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 59}_2 ∧ -b^{4, 59}_1 ∧ -b^{4, 59}_0 ∧ true) 
c  in CNF:
c    -b^{4, 59}_2 ∨  b^{4, 59}_1 ∨  b^{4, 59}_0 ∨ false 
c  in DIMACS:
-7730  7731  7732  0

c  3 does not represent an automaton state.
c    -(-b^{4, 59}_2 ∧  b^{4, 59}_1 ∧  b^{4, 59}_0 ∧ true) 
c  in CNF:
c     b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ false 
c  in DIMACS:
 7730 -7731 -7732  0
c  -3 does not represent an automaton state.
c    -( b^{4, 59}_2 ∧  b^{4, 59}_1 ∧  b^{4, 59}_0 ∧ true) 
c  in CNF:
c    -b^{4, 59}_2 ∨ -b^{4, 59}_1 ∨ -b^{4, 59}_0 ∨ false 
c  in DIMACS:
-7730 -7731 -7732  0

c i = 60
c  -2+1 --> -1
c    ( b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧  p_240) -> ( b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0)
c  in CNF:
c    -b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨  b^{4, 61}_2
c    -b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_1
c    -b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨  b^{4, 61}_0
c  in DIMACS:
-7733 -7734  7735 -240  7736 0
-7733 -7734  7735 -240 -7737 0
-7733 -7734  7735 -240  7738 0

c  -1+1 --> 0
c    ( b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0 ∧  p_240) -> (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧ -b^{4, 61}_0)
c  in CNF:
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_2
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_1
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_0
c  in DIMACS:
-7733  7734 -7735 -240 -7736 0
-7733  7734 -7735 -240 -7737 0
-7733  7734 -7735 -240 -7738 0

c  0+1 --> 1
c    (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧  p_240) -> (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0)
c  in CNF:
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_2
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_1
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨  b^{4, 61}_0
c  in DIMACS:
 7733  7734  7735 -240 -7736 0
 7733  7734  7735 -240 -7737 0
 7733  7734  7735 -240  7738 0

c  1+1 --> 2
c    (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0 ∧  p_240) -> (-b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0)
c  in CNF:
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_2
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨  b^{4, 61}_1
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ -p_240 ∨ -b^{4, 61}_0
c  in DIMACS:
 7733  7734 -7735 -240 -7736 0
 7733  7734 -7735 -240  7737 0
 7733  7734 -7735 -240 -7738 0

c  2+1 --> break 
c    (-b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧  p_240) -> break
c  in CNF:
c     b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 7733 -7734  7735 -240 1162 0


c  2-1 --> 1
c    (-b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧ -p_240) -> (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0)
c  in CNF:
c     b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_2
c     b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_1
c     b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨  b^{4, 61}_0
c  in DIMACS:
 7733 -7734  7735  240 -7736 0
 7733 -7734  7735  240 -7737 0
 7733 -7734  7735  240  7738 0

c  1-1 --> 0
c    (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0 ∧ -p_240) -> (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧ -b^{4, 61}_0)
c  in CNF:
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_2
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_1
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_0
c  in DIMACS:
 7733  7734 -7735  240 -7736 0
 7733  7734 -7735  240 -7737 0
 7733  7734 -7735  240 -7738 0

c  0-1 --> -1
c    (-b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧ -p_240) -> ( b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0)
c  in CNF:
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨  b^{4, 61}_2
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_1
c     b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨  b^{4, 61}_0
c  in DIMACS:
 7733  7734  7735  240  7736 0
 7733  7734  7735  240 -7737 0
 7733  7734  7735  240  7738 0

c  -1-1 --> -2
c    ( b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧  b^{4, 60}_0 ∧ -p_240) -> ( b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0)
c  in CNF:
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨  b^{4, 61}_2
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨  b^{4, 61}_1
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨  p_240 ∨ -b^{4, 61}_0
c  in DIMACS:
-7733  7734 -7735  240  7736 0
-7733  7734 -7735  240  7737 0
-7733  7734 -7735  240 -7738 0

c  -2-1 --> break 
c    ( b^{4, 60}_2 ∧  b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨  b^{4, 60}_0 ∨  p_240 ∨ break
c  in DIMACS:
-7733 -7734  7735  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 60}_2 ∧ -b^{4, 60}_1 ∧ -b^{4, 60}_0 ∧ true) 
c  in CNF:
c    -b^{4, 60}_2 ∨  b^{4, 60}_1 ∨  b^{4, 60}_0 ∨ false 
c  in DIMACS:
-7733  7734  7735  0

c  3 does not represent an automaton state.
c    -(-b^{4, 60}_2 ∧  b^{4, 60}_1 ∧  b^{4, 60}_0 ∧ true) 
c  in CNF:
c     b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ false 
c  in DIMACS:
 7733 -7734 -7735  0
c  -3 does not represent an automaton state.
c    -( b^{4, 60}_2 ∧  b^{4, 60}_1 ∧  b^{4, 60}_0 ∧ true) 
c  in CNF:
c    -b^{4, 60}_2 ∨ -b^{4, 60}_1 ∨ -b^{4, 60}_0 ∨ false 
c  in DIMACS:
-7733 -7734 -7735  0

c i = 61
c  -2+1 --> -1
c    ( b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧  p_244) -> ( b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0)
c  in CNF:
c    -b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨  b^{4, 62}_2
c    -b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_1
c    -b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨  b^{4, 62}_0
c  in DIMACS:
-7736 -7737  7738 -244  7739 0
-7736 -7737  7738 -244 -7740 0
-7736 -7737  7738 -244  7741 0

c  -1+1 --> 0
c    ( b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0 ∧  p_244) -> (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧ -b^{4, 62}_0)
c  in CNF:
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_2
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_1
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_0
c  in DIMACS:
-7736  7737 -7738 -244 -7739 0
-7736  7737 -7738 -244 -7740 0
-7736  7737 -7738 -244 -7741 0

c  0+1 --> 1
c    (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧  p_244) -> (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0)
c  in CNF:
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_2
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_1
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨  b^{4, 62}_0
c  in DIMACS:
 7736  7737  7738 -244 -7739 0
 7736  7737  7738 -244 -7740 0
 7736  7737  7738 -244  7741 0

c  1+1 --> 2
c    (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0 ∧  p_244) -> (-b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0)
c  in CNF:
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_2
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨  b^{4, 62}_1
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ -p_244 ∨ -b^{4, 62}_0
c  in DIMACS:
 7736  7737 -7738 -244 -7739 0
 7736  7737 -7738 -244  7740 0
 7736  7737 -7738 -244 -7741 0

c  2+1 --> break 
c    (-b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧  p_244) -> break
c  in CNF:
c     b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 7736 -7737  7738 -244 1162 0


c  2-1 --> 1
c    (-b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧ -p_244) -> (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0)
c  in CNF:
c     b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_2
c     b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_1
c     b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨  b^{4, 62}_0
c  in DIMACS:
 7736 -7737  7738  244 -7739 0
 7736 -7737  7738  244 -7740 0
 7736 -7737  7738  244  7741 0

c  1-1 --> 0
c    (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0 ∧ -p_244) -> (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧ -b^{4, 62}_0)
c  in CNF:
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_2
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_1
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_0
c  in DIMACS:
 7736  7737 -7738  244 -7739 0
 7736  7737 -7738  244 -7740 0
 7736  7737 -7738  244 -7741 0

c  0-1 --> -1
c    (-b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧ -p_244) -> ( b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0)
c  in CNF:
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨  b^{4, 62}_2
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_1
c     b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨  b^{4, 62}_0
c  in DIMACS:
 7736  7737  7738  244  7739 0
 7736  7737  7738  244 -7740 0
 7736  7737  7738  244  7741 0

c  -1-1 --> -2
c    ( b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧  b^{4, 61}_0 ∧ -p_244) -> ( b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0)
c  in CNF:
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨  b^{4, 62}_2
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨  b^{4, 62}_1
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨  p_244 ∨ -b^{4, 62}_0
c  in DIMACS:
-7736  7737 -7738  244  7739 0
-7736  7737 -7738  244  7740 0
-7736  7737 -7738  244 -7741 0

c  -2-1 --> break 
c    ( b^{4, 61}_2 ∧  b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨  b^{4, 61}_0 ∨  p_244 ∨ break
c  in DIMACS:
-7736 -7737  7738  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 61}_2 ∧ -b^{4, 61}_1 ∧ -b^{4, 61}_0 ∧ true) 
c  in CNF:
c    -b^{4, 61}_2 ∨  b^{4, 61}_1 ∨  b^{4, 61}_0 ∨ false 
c  in DIMACS:
-7736  7737  7738  0

c  3 does not represent an automaton state.
c    -(-b^{4, 61}_2 ∧  b^{4, 61}_1 ∧  b^{4, 61}_0 ∧ true) 
c  in CNF:
c     b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ false 
c  in DIMACS:
 7736 -7737 -7738  0
c  -3 does not represent an automaton state.
c    -( b^{4, 61}_2 ∧  b^{4, 61}_1 ∧  b^{4, 61}_0 ∧ true) 
c  in CNF:
c    -b^{4, 61}_2 ∨ -b^{4, 61}_1 ∨ -b^{4, 61}_0 ∨ false 
c  in DIMACS:
-7736 -7737 -7738  0

c i = 62
c  -2+1 --> -1
c    ( b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧  p_248) -> ( b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0)
c  in CNF:
c    -b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨  b^{4, 63}_2
c    -b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_1
c    -b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨  b^{4, 63}_0
c  in DIMACS:
-7739 -7740  7741 -248  7742 0
-7739 -7740  7741 -248 -7743 0
-7739 -7740  7741 -248  7744 0

c  -1+1 --> 0
c    ( b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0 ∧  p_248) -> (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧ -b^{4, 63}_0)
c  in CNF:
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_2
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_1
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_0
c  in DIMACS:
-7739  7740 -7741 -248 -7742 0
-7739  7740 -7741 -248 -7743 0
-7739  7740 -7741 -248 -7744 0

c  0+1 --> 1
c    (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧  p_248) -> (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0)
c  in CNF:
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_2
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_1
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨  b^{4, 63}_0
c  in DIMACS:
 7739  7740  7741 -248 -7742 0
 7739  7740  7741 -248 -7743 0
 7739  7740  7741 -248  7744 0

c  1+1 --> 2
c    (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0 ∧  p_248) -> (-b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0)
c  in CNF:
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_2
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨  b^{4, 63}_1
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ -p_248 ∨ -b^{4, 63}_0
c  in DIMACS:
 7739  7740 -7741 -248 -7742 0
 7739  7740 -7741 -248  7743 0
 7739  7740 -7741 -248 -7744 0

c  2+1 --> break 
c    (-b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧  p_248) -> break
c  in CNF:
c     b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 7739 -7740  7741 -248 1162 0


c  2-1 --> 1
c    (-b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧ -p_248) -> (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0)
c  in CNF:
c     b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_2
c     b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_1
c     b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨  b^{4, 63}_0
c  in DIMACS:
 7739 -7740  7741  248 -7742 0
 7739 -7740  7741  248 -7743 0
 7739 -7740  7741  248  7744 0

c  1-1 --> 0
c    (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0 ∧ -p_248) -> (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧ -b^{4, 63}_0)
c  in CNF:
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_2
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_1
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_0
c  in DIMACS:
 7739  7740 -7741  248 -7742 0
 7739  7740 -7741  248 -7743 0
 7739  7740 -7741  248 -7744 0

c  0-1 --> -1
c    (-b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧ -p_248) -> ( b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0)
c  in CNF:
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨  b^{4, 63}_2
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_1
c     b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨  b^{4, 63}_0
c  in DIMACS:
 7739  7740  7741  248  7742 0
 7739  7740  7741  248 -7743 0
 7739  7740  7741  248  7744 0

c  -1-1 --> -2
c    ( b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧  b^{4, 62}_0 ∧ -p_248) -> ( b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0)
c  in CNF:
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨  b^{4, 63}_2
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨  b^{4, 63}_1
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨  p_248 ∨ -b^{4, 63}_0
c  in DIMACS:
-7739  7740 -7741  248  7742 0
-7739  7740 -7741  248  7743 0
-7739  7740 -7741  248 -7744 0

c  -2-1 --> break 
c    ( b^{4, 62}_2 ∧  b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨  b^{4, 62}_0 ∨  p_248 ∨ break
c  in DIMACS:
-7739 -7740  7741  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 62}_2 ∧ -b^{4, 62}_1 ∧ -b^{4, 62}_0 ∧ true) 
c  in CNF:
c    -b^{4, 62}_2 ∨  b^{4, 62}_1 ∨  b^{4, 62}_0 ∨ false 
c  in DIMACS:
-7739  7740  7741  0

c  3 does not represent an automaton state.
c    -(-b^{4, 62}_2 ∧  b^{4, 62}_1 ∧  b^{4, 62}_0 ∧ true) 
c  in CNF:
c     b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ false 
c  in DIMACS:
 7739 -7740 -7741  0
c  -3 does not represent an automaton state.
c    -( b^{4, 62}_2 ∧  b^{4, 62}_1 ∧  b^{4, 62}_0 ∧ true) 
c  in CNF:
c    -b^{4, 62}_2 ∨ -b^{4, 62}_1 ∨ -b^{4, 62}_0 ∨ false 
c  in DIMACS:
-7739 -7740 -7741  0

c i = 63
c  -2+1 --> -1
c    ( b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧  p_252) -> ( b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0)
c  in CNF:
c    -b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨  b^{4, 64}_2
c    -b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_1
c    -b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨  b^{4, 64}_0
c  in DIMACS:
-7742 -7743  7744 -252  7745 0
-7742 -7743  7744 -252 -7746 0
-7742 -7743  7744 -252  7747 0

c  -1+1 --> 0
c    ( b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0 ∧  p_252) -> (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧ -b^{4, 64}_0)
c  in CNF:
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_2
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_1
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_0
c  in DIMACS:
-7742  7743 -7744 -252 -7745 0
-7742  7743 -7744 -252 -7746 0
-7742  7743 -7744 -252 -7747 0

c  0+1 --> 1
c    (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧  p_252) -> (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0)
c  in CNF:
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_2
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_1
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨  b^{4, 64}_0
c  in DIMACS:
 7742  7743  7744 -252 -7745 0
 7742  7743  7744 -252 -7746 0
 7742  7743  7744 -252  7747 0

c  1+1 --> 2
c    (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0 ∧  p_252) -> (-b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0)
c  in CNF:
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_2
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨  b^{4, 64}_1
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ -p_252 ∨ -b^{4, 64}_0
c  in DIMACS:
 7742  7743 -7744 -252 -7745 0
 7742  7743 -7744 -252  7746 0
 7742  7743 -7744 -252 -7747 0

c  2+1 --> break 
c    (-b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧  p_252) -> break
c  in CNF:
c     b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 7742 -7743  7744 -252 1162 0


c  2-1 --> 1
c    (-b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧ -p_252) -> (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0)
c  in CNF:
c     b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_2
c     b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_1
c     b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨  b^{4, 64}_0
c  in DIMACS:
 7742 -7743  7744  252 -7745 0
 7742 -7743  7744  252 -7746 0
 7742 -7743  7744  252  7747 0

c  1-1 --> 0
c    (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0 ∧ -p_252) -> (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧ -b^{4, 64}_0)
c  in CNF:
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_2
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_1
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_0
c  in DIMACS:
 7742  7743 -7744  252 -7745 0
 7742  7743 -7744  252 -7746 0
 7742  7743 -7744  252 -7747 0

c  0-1 --> -1
c    (-b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧ -p_252) -> ( b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0)
c  in CNF:
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨  b^{4, 64}_2
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_1
c     b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨  b^{4, 64}_0
c  in DIMACS:
 7742  7743  7744  252  7745 0
 7742  7743  7744  252 -7746 0
 7742  7743  7744  252  7747 0

c  -1-1 --> -2
c    ( b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧  b^{4, 63}_0 ∧ -p_252) -> ( b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0)
c  in CNF:
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨  b^{4, 64}_2
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨  b^{4, 64}_1
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨  p_252 ∨ -b^{4, 64}_0
c  in DIMACS:
-7742  7743 -7744  252  7745 0
-7742  7743 -7744  252  7746 0
-7742  7743 -7744  252 -7747 0

c  -2-1 --> break 
c    ( b^{4, 63}_2 ∧  b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨  b^{4, 63}_0 ∨  p_252 ∨ break
c  in DIMACS:
-7742 -7743  7744  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 63}_2 ∧ -b^{4, 63}_1 ∧ -b^{4, 63}_0 ∧ true) 
c  in CNF:
c    -b^{4, 63}_2 ∨  b^{4, 63}_1 ∨  b^{4, 63}_0 ∨ false 
c  in DIMACS:
-7742  7743  7744  0

c  3 does not represent an automaton state.
c    -(-b^{4, 63}_2 ∧  b^{4, 63}_1 ∧  b^{4, 63}_0 ∧ true) 
c  in CNF:
c     b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ false 
c  in DIMACS:
 7742 -7743 -7744  0
c  -3 does not represent an automaton state.
c    -( b^{4, 63}_2 ∧  b^{4, 63}_1 ∧  b^{4, 63}_0 ∧ true) 
c  in CNF:
c    -b^{4, 63}_2 ∨ -b^{4, 63}_1 ∨ -b^{4, 63}_0 ∨ false 
c  in DIMACS:
-7742 -7743 -7744  0

c i = 64
c  -2+1 --> -1
c    ( b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧  p_256) -> ( b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0)
c  in CNF:
c    -b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨  b^{4, 65}_2
c    -b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_1
c    -b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨  b^{4, 65}_0
c  in DIMACS:
-7745 -7746  7747 -256  7748 0
-7745 -7746  7747 -256 -7749 0
-7745 -7746  7747 -256  7750 0

c  -1+1 --> 0
c    ( b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0 ∧  p_256) -> (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧ -b^{4, 65}_0)
c  in CNF:
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_2
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_1
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_0
c  in DIMACS:
-7745  7746 -7747 -256 -7748 0
-7745  7746 -7747 -256 -7749 0
-7745  7746 -7747 -256 -7750 0

c  0+1 --> 1
c    (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧  p_256) -> (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0)
c  in CNF:
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_2
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_1
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨  b^{4, 65}_0
c  in DIMACS:
 7745  7746  7747 -256 -7748 0
 7745  7746  7747 -256 -7749 0
 7745  7746  7747 -256  7750 0

c  1+1 --> 2
c    (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0 ∧  p_256) -> (-b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0)
c  in CNF:
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_2
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨  b^{4, 65}_1
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ -p_256 ∨ -b^{4, 65}_0
c  in DIMACS:
 7745  7746 -7747 -256 -7748 0
 7745  7746 -7747 -256  7749 0
 7745  7746 -7747 -256 -7750 0

c  2+1 --> break 
c    (-b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧  p_256) -> break
c  in CNF:
c     b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 7745 -7746  7747 -256 1162 0


c  2-1 --> 1
c    (-b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧ -p_256) -> (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0)
c  in CNF:
c     b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_2
c     b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_1
c     b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨  b^{4, 65}_0
c  in DIMACS:
 7745 -7746  7747  256 -7748 0
 7745 -7746  7747  256 -7749 0
 7745 -7746  7747  256  7750 0

c  1-1 --> 0
c    (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0 ∧ -p_256) -> (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧ -b^{4, 65}_0)
c  in CNF:
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_2
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_1
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_0
c  in DIMACS:
 7745  7746 -7747  256 -7748 0
 7745  7746 -7747  256 -7749 0
 7745  7746 -7747  256 -7750 0

c  0-1 --> -1
c    (-b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧ -p_256) -> ( b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0)
c  in CNF:
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨  b^{4, 65}_2
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_1
c     b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨  b^{4, 65}_0
c  in DIMACS:
 7745  7746  7747  256  7748 0
 7745  7746  7747  256 -7749 0
 7745  7746  7747  256  7750 0

c  -1-1 --> -2
c    ( b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧  b^{4, 64}_0 ∧ -p_256) -> ( b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0)
c  in CNF:
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨  b^{4, 65}_2
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨  b^{4, 65}_1
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨  p_256 ∨ -b^{4, 65}_0
c  in DIMACS:
-7745  7746 -7747  256  7748 0
-7745  7746 -7747  256  7749 0
-7745  7746 -7747  256 -7750 0

c  -2-1 --> break 
c    ( b^{4, 64}_2 ∧  b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨  b^{4, 64}_0 ∨  p_256 ∨ break
c  in DIMACS:
-7745 -7746  7747  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 64}_2 ∧ -b^{4, 64}_1 ∧ -b^{4, 64}_0 ∧ true) 
c  in CNF:
c    -b^{4, 64}_2 ∨  b^{4, 64}_1 ∨  b^{4, 64}_0 ∨ false 
c  in DIMACS:
-7745  7746  7747  0

c  3 does not represent an automaton state.
c    -(-b^{4, 64}_2 ∧  b^{4, 64}_1 ∧  b^{4, 64}_0 ∧ true) 
c  in CNF:
c     b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ false 
c  in DIMACS:
 7745 -7746 -7747  0
c  -3 does not represent an automaton state.
c    -( b^{4, 64}_2 ∧  b^{4, 64}_1 ∧  b^{4, 64}_0 ∧ true) 
c  in CNF:
c    -b^{4, 64}_2 ∨ -b^{4, 64}_1 ∨ -b^{4, 64}_0 ∨ false 
c  in DIMACS:
-7745 -7746 -7747  0

c i = 65
c  -2+1 --> -1
c    ( b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧  p_260) -> ( b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0)
c  in CNF:
c    -b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨  b^{4, 66}_2
c    -b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_1
c    -b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨  b^{4, 66}_0
c  in DIMACS:
-7748 -7749  7750 -260  7751 0
-7748 -7749  7750 -260 -7752 0
-7748 -7749  7750 -260  7753 0

c  -1+1 --> 0
c    ( b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0 ∧  p_260) -> (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧ -b^{4, 66}_0)
c  in CNF:
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_2
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_1
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_0
c  in DIMACS:
-7748  7749 -7750 -260 -7751 0
-7748  7749 -7750 -260 -7752 0
-7748  7749 -7750 -260 -7753 0

c  0+1 --> 1
c    (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧  p_260) -> (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0)
c  in CNF:
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_2
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_1
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨  b^{4, 66}_0
c  in DIMACS:
 7748  7749  7750 -260 -7751 0
 7748  7749  7750 -260 -7752 0
 7748  7749  7750 -260  7753 0

c  1+1 --> 2
c    (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0 ∧  p_260) -> (-b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0)
c  in CNF:
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_2
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨  b^{4, 66}_1
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ -p_260 ∨ -b^{4, 66}_0
c  in DIMACS:
 7748  7749 -7750 -260 -7751 0
 7748  7749 -7750 -260  7752 0
 7748  7749 -7750 -260 -7753 0

c  2+1 --> break 
c    (-b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧  p_260) -> break
c  in CNF:
c     b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 7748 -7749  7750 -260 1162 0


c  2-1 --> 1
c    (-b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧ -p_260) -> (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0)
c  in CNF:
c     b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_2
c     b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_1
c     b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨  b^{4, 66}_0
c  in DIMACS:
 7748 -7749  7750  260 -7751 0
 7748 -7749  7750  260 -7752 0
 7748 -7749  7750  260  7753 0

c  1-1 --> 0
c    (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0 ∧ -p_260) -> (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧ -b^{4, 66}_0)
c  in CNF:
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_2
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_1
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_0
c  in DIMACS:
 7748  7749 -7750  260 -7751 0
 7748  7749 -7750  260 -7752 0
 7748  7749 -7750  260 -7753 0

c  0-1 --> -1
c    (-b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧ -p_260) -> ( b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0)
c  in CNF:
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨  b^{4, 66}_2
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_1
c     b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨  b^{4, 66}_0
c  in DIMACS:
 7748  7749  7750  260  7751 0
 7748  7749  7750  260 -7752 0
 7748  7749  7750  260  7753 0

c  -1-1 --> -2
c    ( b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧  b^{4, 65}_0 ∧ -p_260) -> ( b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0)
c  in CNF:
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨  b^{4, 66}_2
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨  b^{4, 66}_1
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨  p_260 ∨ -b^{4, 66}_0
c  in DIMACS:
-7748  7749 -7750  260  7751 0
-7748  7749 -7750  260  7752 0
-7748  7749 -7750  260 -7753 0

c  -2-1 --> break 
c    ( b^{4, 65}_2 ∧  b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨  b^{4, 65}_0 ∨  p_260 ∨ break
c  in DIMACS:
-7748 -7749  7750  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 65}_2 ∧ -b^{4, 65}_1 ∧ -b^{4, 65}_0 ∧ true) 
c  in CNF:
c    -b^{4, 65}_2 ∨  b^{4, 65}_1 ∨  b^{4, 65}_0 ∨ false 
c  in DIMACS:
-7748  7749  7750  0

c  3 does not represent an automaton state.
c    -(-b^{4, 65}_2 ∧  b^{4, 65}_1 ∧  b^{4, 65}_0 ∧ true) 
c  in CNF:
c     b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ false 
c  in DIMACS:
 7748 -7749 -7750  0
c  -3 does not represent an automaton state.
c    -( b^{4, 65}_2 ∧  b^{4, 65}_1 ∧  b^{4, 65}_0 ∧ true) 
c  in CNF:
c    -b^{4, 65}_2 ∨ -b^{4, 65}_1 ∨ -b^{4, 65}_0 ∨ false 
c  in DIMACS:
-7748 -7749 -7750  0

c i = 66
c  -2+1 --> -1
c    ( b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧  p_264) -> ( b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0)
c  in CNF:
c    -b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨  b^{4, 67}_2
c    -b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_1
c    -b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨  b^{4, 67}_0
c  in DIMACS:
-7751 -7752  7753 -264  7754 0
-7751 -7752  7753 -264 -7755 0
-7751 -7752  7753 -264  7756 0

c  -1+1 --> 0
c    ( b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0 ∧  p_264) -> (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧ -b^{4, 67}_0)
c  in CNF:
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_2
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_1
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_0
c  in DIMACS:
-7751  7752 -7753 -264 -7754 0
-7751  7752 -7753 -264 -7755 0
-7751  7752 -7753 -264 -7756 0

c  0+1 --> 1
c    (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧  p_264) -> (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0)
c  in CNF:
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_2
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_1
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨  b^{4, 67}_0
c  in DIMACS:
 7751  7752  7753 -264 -7754 0
 7751  7752  7753 -264 -7755 0
 7751  7752  7753 -264  7756 0

c  1+1 --> 2
c    (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0 ∧  p_264) -> (-b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0)
c  in CNF:
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_2
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨  b^{4, 67}_1
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ -p_264 ∨ -b^{4, 67}_0
c  in DIMACS:
 7751  7752 -7753 -264 -7754 0
 7751  7752 -7753 -264  7755 0
 7751  7752 -7753 -264 -7756 0

c  2+1 --> break 
c    (-b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧  p_264) -> break
c  in CNF:
c     b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 7751 -7752  7753 -264 1162 0


c  2-1 --> 1
c    (-b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧ -p_264) -> (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0)
c  in CNF:
c     b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_2
c     b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_1
c     b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨  b^{4, 67}_0
c  in DIMACS:
 7751 -7752  7753  264 -7754 0
 7751 -7752  7753  264 -7755 0
 7751 -7752  7753  264  7756 0

c  1-1 --> 0
c    (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0 ∧ -p_264) -> (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧ -b^{4, 67}_0)
c  in CNF:
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_2
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_1
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_0
c  in DIMACS:
 7751  7752 -7753  264 -7754 0
 7751  7752 -7753  264 -7755 0
 7751  7752 -7753  264 -7756 0

c  0-1 --> -1
c    (-b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧ -p_264) -> ( b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0)
c  in CNF:
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨  b^{4, 67}_2
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_1
c     b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨  b^{4, 67}_0
c  in DIMACS:
 7751  7752  7753  264  7754 0
 7751  7752  7753  264 -7755 0
 7751  7752  7753  264  7756 0

c  -1-1 --> -2
c    ( b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧  b^{4, 66}_0 ∧ -p_264) -> ( b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0)
c  in CNF:
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨  b^{4, 67}_2
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨  b^{4, 67}_1
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨  p_264 ∨ -b^{4, 67}_0
c  in DIMACS:
-7751  7752 -7753  264  7754 0
-7751  7752 -7753  264  7755 0
-7751  7752 -7753  264 -7756 0

c  -2-1 --> break 
c    ( b^{4, 66}_2 ∧  b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨  b^{4, 66}_0 ∨  p_264 ∨ break
c  in DIMACS:
-7751 -7752  7753  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 66}_2 ∧ -b^{4, 66}_1 ∧ -b^{4, 66}_0 ∧ true) 
c  in CNF:
c    -b^{4, 66}_2 ∨  b^{4, 66}_1 ∨  b^{4, 66}_0 ∨ false 
c  in DIMACS:
-7751  7752  7753  0

c  3 does not represent an automaton state.
c    -(-b^{4, 66}_2 ∧  b^{4, 66}_1 ∧  b^{4, 66}_0 ∧ true) 
c  in CNF:
c     b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ false 
c  in DIMACS:
 7751 -7752 -7753  0
c  -3 does not represent an automaton state.
c    -( b^{4, 66}_2 ∧  b^{4, 66}_1 ∧  b^{4, 66}_0 ∧ true) 
c  in CNF:
c    -b^{4, 66}_2 ∨ -b^{4, 66}_1 ∨ -b^{4, 66}_0 ∨ false 
c  in DIMACS:
-7751 -7752 -7753  0

c i = 67
c  -2+1 --> -1
c    ( b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧  p_268) -> ( b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0)
c  in CNF:
c    -b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨  b^{4, 68}_2
c    -b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_1
c    -b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨  b^{4, 68}_0
c  in DIMACS:
-7754 -7755  7756 -268  7757 0
-7754 -7755  7756 -268 -7758 0
-7754 -7755  7756 -268  7759 0

c  -1+1 --> 0
c    ( b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0 ∧  p_268) -> (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧ -b^{4, 68}_0)
c  in CNF:
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_2
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_1
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_0
c  in DIMACS:
-7754  7755 -7756 -268 -7757 0
-7754  7755 -7756 -268 -7758 0
-7754  7755 -7756 -268 -7759 0

c  0+1 --> 1
c    (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧  p_268) -> (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0)
c  in CNF:
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_2
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_1
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨  b^{4, 68}_0
c  in DIMACS:
 7754  7755  7756 -268 -7757 0
 7754  7755  7756 -268 -7758 0
 7754  7755  7756 -268  7759 0

c  1+1 --> 2
c    (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0 ∧  p_268) -> (-b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0)
c  in CNF:
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_2
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨  b^{4, 68}_1
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ -p_268 ∨ -b^{4, 68}_0
c  in DIMACS:
 7754  7755 -7756 -268 -7757 0
 7754  7755 -7756 -268  7758 0
 7754  7755 -7756 -268 -7759 0

c  2+1 --> break 
c    (-b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧  p_268) -> break
c  in CNF:
c     b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 7754 -7755  7756 -268 1162 0


c  2-1 --> 1
c    (-b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧ -p_268) -> (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0)
c  in CNF:
c     b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_2
c     b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_1
c     b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨  b^{4, 68}_0
c  in DIMACS:
 7754 -7755  7756  268 -7757 0
 7754 -7755  7756  268 -7758 0
 7754 -7755  7756  268  7759 0

c  1-1 --> 0
c    (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0 ∧ -p_268) -> (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧ -b^{4, 68}_0)
c  in CNF:
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_2
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_1
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_0
c  in DIMACS:
 7754  7755 -7756  268 -7757 0
 7754  7755 -7756  268 -7758 0
 7754  7755 -7756  268 -7759 0

c  0-1 --> -1
c    (-b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧ -p_268) -> ( b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0)
c  in CNF:
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨  b^{4, 68}_2
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_1
c     b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨  b^{4, 68}_0
c  in DIMACS:
 7754  7755  7756  268  7757 0
 7754  7755  7756  268 -7758 0
 7754  7755  7756  268  7759 0

c  -1-1 --> -2
c    ( b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧  b^{4, 67}_0 ∧ -p_268) -> ( b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0)
c  in CNF:
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨  b^{4, 68}_2
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨  b^{4, 68}_1
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨  p_268 ∨ -b^{4, 68}_0
c  in DIMACS:
-7754  7755 -7756  268  7757 0
-7754  7755 -7756  268  7758 0
-7754  7755 -7756  268 -7759 0

c  -2-1 --> break 
c    ( b^{4, 67}_2 ∧  b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨  b^{4, 67}_0 ∨  p_268 ∨ break
c  in DIMACS:
-7754 -7755  7756  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 67}_2 ∧ -b^{4, 67}_1 ∧ -b^{4, 67}_0 ∧ true) 
c  in CNF:
c    -b^{4, 67}_2 ∨  b^{4, 67}_1 ∨  b^{4, 67}_0 ∨ false 
c  in DIMACS:
-7754  7755  7756  0

c  3 does not represent an automaton state.
c    -(-b^{4, 67}_2 ∧  b^{4, 67}_1 ∧  b^{4, 67}_0 ∧ true) 
c  in CNF:
c     b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ false 
c  in DIMACS:
 7754 -7755 -7756  0
c  -3 does not represent an automaton state.
c    -( b^{4, 67}_2 ∧  b^{4, 67}_1 ∧  b^{4, 67}_0 ∧ true) 
c  in CNF:
c    -b^{4, 67}_2 ∨ -b^{4, 67}_1 ∨ -b^{4, 67}_0 ∨ false 
c  in DIMACS:
-7754 -7755 -7756  0

c i = 68
c  -2+1 --> -1
c    ( b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧  p_272) -> ( b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0)
c  in CNF:
c    -b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨  b^{4, 69}_2
c    -b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_1
c    -b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨  b^{4, 69}_0
c  in DIMACS:
-7757 -7758  7759 -272  7760 0
-7757 -7758  7759 -272 -7761 0
-7757 -7758  7759 -272  7762 0

c  -1+1 --> 0
c    ( b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0 ∧  p_272) -> (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧ -b^{4, 69}_0)
c  in CNF:
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_2
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_1
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_0
c  in DIMACS:
-7757  7758 -7759 -272 -7760 0
-7757  7758 -7759 -272 -7761 0
-7757  7758 -7759 -272 -7762 0

c  0+1 --> 1
c    (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧  p_272) -> (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0)
c  in CNF:
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_2
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_1
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨  b^{4, 69}_0
c  in DIMACS:
 7757  7758  7759 -272 -7760 0
 7757  7758  7759 -272 -7761 0
 7757  7758  7759 -272  7762 0

c  1+1 --> 2
c    (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0 ∧  p_272) -> (-b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0)
c  in CNF:
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_2
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨  b^{4, 69}_1
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ -p_272 ∨ -b^{4, 69}_0
c  in DIMACS:
 7757  7758 -7759 -272 -7760 0
 7757  7758 -7759 -272  7761 0
 7757  7758 -7759 -272 -7762 0

c  2+1 --> break 
c    (-b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧  p_272) -> break
c  in CNF:
c     b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 7757 -7758  7759 -272 1162 0


c  2-1 --> 1
c    (-b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧ -p_272) -> (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0)
c  in CNF:
c     b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_2
c     b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_1
c     b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨  b^{4, 69}_0
c  in DIMACS:
 7757 -7758  7759  272 -7760 0
 7757 -7758  7759  272 -7761 0
 7757 -7758  7759  272  7762 0

c  1-1 --> 0
c    (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0 ∧ -p_272) -> (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧ -b^{4, 69}_0)
c  in CNF:
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_2
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_1
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_0
c  in DIMACS:
 7757  7758 -7759  272 -7760 0
 7757  7758 -7759  272 -7761 0
 7757  7758 -7759  272 -7762 0

c  0-1 --> -1
c    (-b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧ -p_272) -> ( b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0)
c  in CNF:
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨  b^{4, 69}_2
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_1
c     b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨  b^{4, 69}_0
c  in DIMACS:
 7757  7758  7759  272  7760 0
 7757  7758  7759  272 -7761 0
 7757  7758  7759  272  7762 0

c  -1-1 --> -2
c    ( b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧  b^{4, 68}_0 ∧ -p_272) -> ( b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0)
c  in CNF:
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨  b^{4, 69}_2
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨  b^{4, 69}_1
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨  p_272 ∨ -b^{4, 69}_0
c  in DIMACS:
-7757  7758 -7759  272  7760 0
-7757  7758 -7759  272  7761 0
-7757  7758 -7759  272 -7762 0

c  -2-1 --> break 
c    ( b^{4, 68}_2 ∧  b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨  b^{4, 68}_0 ∨  p_272 ∨ break
c  in DIMACS:
-7757 -7758  7759  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 68}_2 ∧ -b^{4, 68}_1 ∧ -b^{4, 68}_0 ∧ true) 
c  in CNF:
c    -b^{4, 68}_2 ∨  b^{4, 68}_1 ∨  b^{4, 68}_0 ∨ false 
c  in DIMACS:
-7757  7758  7759  0

c  3 does not represent an automaton state.
c    -(-b^{4, 68}_2 ∧  b^{4, 68}_1 ∧  b^{4, 68}_0 ∧ true) 
c  in CNF:
c     b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ false 
c  in DIMACS:
 7757 -7758 -7759  0
c  -3 does not represent an automaton state.
c    -( b^{4, 68}_2 ∧  b^{4, 68}_1 ∧  b^{4, 68}_0 ∧ true) 
c  in CNF:
c    -b^{4, 68}_2 ∨ -b^{4, 68}_1 ∨ -b^{4, 68}_0 ∨ false 
c  in DIMACS:
-7757 -7758 -7759  0

c i = 69
c  -2+1 --> -1
c    ( b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧  p_276) -> ( b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0)
c  in CNF:
c    -b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨  b^{4, 70}_2
c    -b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_1
c    -b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨  b^{4, 70}_0
c  in DIMACS:
-7760 -7761  7762 -276  7763 0
-7760 -7761  7762 -276 -7764 0
-7760 -7761  7762 -276  7765 0

c  -1+1 --> 0
c    ( b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0 ∧  p_276) -> (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧ -b^{4, 70}_0)
c  in CNF:
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_2
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_1
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_0
c  in DIMACS:
-7760  7761 -7762 -276 -7763 0
-7760  7761 -7762 -276 -7764 0
-7760  7761 -7762 -276 -7765 0

c  0+1 --> 1
c    (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧  p_276) -> (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0)
c  in CNF:
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_2
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_1
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨  b^{4, 70}_0
c  in DIMACS:
 7760  7761  7762 -276 -7763 0
 7760  7761  7762 -276 -7764 0
 7760  7761  7762 -276  7765 0

c  1+1 --> 2
c    (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0 ∧  p_276) -> (-b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0)
c  in CNF:
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_2
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨  b^{4, 70}_1
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ -p_276 ∨ -b^{4, 70}_0
c  in DIMACS:
 7760  7761 -7762 -276 -7763 0
 7760  7761 -7762 -276  7764 0
 7760  7761 -7762 -276 -7765 0

c  2+1 --> break 
c    (-b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧  p_276) -> break
c  in CNF:
c     b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 7760 -7761  7762 -276 1162 0


c  2-1 --> 1
c    (-b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧ -p_276) -> (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0)
c  in CNF:
c     b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_2
c     b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_1
c     b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨  b^{4, 70}_0
c  in DIMACS:
 7760 -7761  7762  276 -7763 0
 7760 -7761  7762  276 -7764 0
 7760 -7761  7762  276  7765 0

c  1-1 --> 0
c    (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0 ∧ -p_276) -> (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧ -b^{4, 70}_0)
c  in CNF:
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_2
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_1
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_0
c  in DIMACS:
 7760  7761 -7762  276 -7763 0
 7760  7761 -7762  276 -7764 0
 7760  7761 -7762  276 -7765 0

c  0-1 --> -1
c    (-b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧ -p_276) -> ( b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0)
c  in CNF:
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨  b^{4, 70}_2
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_1
c     b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨  b^{4, 70}_0
c  in DIMACS:
 7760  7761  7762  276  7763 0
 7760  7761  7762  276 -7764 0
 7760  7761  7762  276  7765 0

c  -1-1 --> -2
c    ( b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧  b^{4, 69}_0 ∧ -p_276) -> ( b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0)
c  in CNF:
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨  b^{4, 70}_2
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨  b^{4, 70}_1
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨  p_276 ∨ -b^{4, 70}_0
c  in DIMACS:
-7760  7761 -7762  276  7763 0
-7760  7761 -7762  276  7764 0
-7760  7761 -7762  276 -7765 0

c  -2-1 --> break 
c    ( b^{4, 69}_2 ∧  b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨  b^{4, 69}_0 ∨  p_276 ∨ break
c  in DIMACS:
-7760 -7761  7762  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 69}_2 ∧ -b^{4, 69}_1 ∧ -b^{4, 69}_0 ∧ true) 
c  in CNF:
c    -b^{4, 69}_2 ∨  b^{4, 69}_1 ∨  b^{4, 69}_0 ∨ false 
c  in DIMACS:
-7760  7761  7762  0

c  3 does not represent an automaton state.
c    -(-b^{4, 69}_2 ∧  b^{4, 69}_1 ∧  b^{4, 69}_0 ∧ true) 
c  in CNF:
c     b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ false 
c  in DIMACS:
 7760 -7761 -7762  0
c  -3 does not represent an automaton state.
c    -( b^{4, 69}_2 ∧  b^{4, 69}_1 ∧  b^{4, 69}_0 ∧ true) 
c  in CNF:
c    -b^{4, 69}_2 ∨ -b^{4, 69}_1 ∨ -b^{4, 69}_0 ∨ false 
c  in DIMACS:
-7760 -7761 -7762  0

c i = 70
c  -2+1 --> -1
c    ( b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧  p_280) -> ( b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0)
c  in CNF:
c    -b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨  b^{4, 71}_2
c    -b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_1
c    -b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨  b^{4, 71}_0
c  in DIMACS:
-7763 -7764  7765 -280  7766 0
-7763 -7764  7765 -280 -7767 0
-7763 -7764  7765 -280  7768 0

c  -1+1 --> 0
c    ( b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0 ∧  p_280) -> (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧ -b^{4, 71}_0)
c  in CNF:
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_2
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_1
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_0
c  in DIMACS:
-7763  7764 -7765 -280 -7766 0
-7763  7764 -7765 -280 -7767 0
-7763  7764 -7765 -280 -7768 0

c  0+1 --> 1
c    (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧  p_280) -> (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0)
c  in CNF:
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_2
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_1
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨  b^{4, 71}_0
c  in DIMACS:
 7763  7764  7765 -280 -7766 0
 7763  7764  7765 -280 -7767 0
 7763  7764  7765 -280  7768 0

c  1+1 --> 2
c    (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0 ∧  p_280) -> (-b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0)
c  in CNF:
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_2
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨  b^{4, 71}_1
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ -p_280 ∨ -b^{4, 71}_0
c  in DIMACS:
 7763  7764 -7765 -280 -7766 0
 7763  7764 -7765 -280  7767 0
 7763  7764 -7765 -280 -7768 0

c  2+1 --> break 
c    (-b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧  p_280) -> break
c  in CNF:
c     b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 7763 -7764  7765 -280 1162 0


c  2-1 --> 1
c    (-b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧ -p_280) -> (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0)
c  in CNF:
c     b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_2
c     b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_1
c     b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨  b^{4, 71}_0
c  in DIMACS:
 7763 -7764  7765  280 -7766 0
 7763 -7764  7765  280 -7767 0
 7763 -7764  7765  280  7768 0

c  1-1 --> 0
c    (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0 ∧ -p_280) -> (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧ -b^{4, 71}_0)
c  in CNF:
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_2
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_1
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_0
c  in DIMACS:
 7763  7764 -7765  280 -7766 0
 7763  7764 -7765  280 -7767 0
 7763  7764 -7765  280 -7768 0

c  0-1 --> -1
c    (-b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧ -p_280) -> ( b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0)
c  in CNF:
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨  b^{4, 71}_2
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_1
c     b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨  b^{4, 71}_0
c  in DIMACS:
 7763  7764  7765  280  7766 0
 7763  7764  7765  280 -7767 0
 7763  7764  7765  280  7768 0

c  -1-1 --> -2
c    ( b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧  b^{4, 70}_0 ∧ -p_280) -> ( b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0)
c  in CNF:
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨  b^{4, 71}_2
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨  b^{4, 71}_1
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨  p_280 ∨ -b^{4, 71}_0
c  in DIMACS:
-7763  7764 -7765  280  7766 0
-7763  7764 -7765  280  7767 0
-7763  7764 -7765  280 -7768 0

c  -2-1 --> break 
c    ( b^{4, 70}_2 ∧  b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨  b^{4, 70}_0 ∨  p_280 ∨ break
c  in DIMACS:
-7763 -7764  7765  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 70}_2 ∧ -b^{4, 70}_1 ∧ -b^{4, 70}_0 ∧ true) 
c  in CNF:
c    -b^{4, 70}_2 ∨  b^{4, 70}_1 ∨  b^{4, 70}_0 ∨ false 
c  in DIMACS:
-7763  7764  7765  0

c  3 does not represent an automaton state.
c    -(-b^{4, 70}_2 ∧  b^{4, 70}_1 ∧  b^{4, 70}_0 ∧ true) 
c  in CNF:
c     b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ false 
c  in DIMACS:
 7763 -7764 -7765  0
c  -3 does not represent an automaton state.
c    -( b^{4, 70}_2 ∧  b^{4, 70}_1 ∧  b^{4, 70}_0 ∧ true) 
c  in CNF:
c    -b^{4, 70}_2 ∨ -b^{4, 70}_1 ∨ -b^{4, 70}_0 ∨ false 
c  in DIMACS:
-7763 -7764 -7765  0

c i = 71
c  -2+1 --> -1
c    ( b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧  p_284) -> ( b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0)
c  in CNF:
c    -b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨  b^{4, 72}_2
c    -b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_1
c    -b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨  b^{4, 72}_0
c  in DIMACS:
-7766 -7767  7768 -284  7769 0
-7766 -7767  7768 -284 -7770 0
-7766 -7767  7768 -284  7771 0

c  -1+1 --> 0
c    ( b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0 ∧  p_284) -> (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧ -b^{4, 72}_0)
c  in CNF:
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_2
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_1
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_0
c  in DIMACS:
-7766  7767 -7768 -284 -7769 0
-7766  7767 -7768 -284 -7770 0
-7766  7767 -7768 -284 -7771 0

c  0+1 --> 1
c    (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧  p_284) -> (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0)
c  in CNF:
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_2
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_1
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨  b^{4, 72}_0
c  in DIMACS:
 7766  7767  7768 -284 -7769 0
 7766  7767  7768 -284 -7770 0
 7766  7767  7768 -284  7771 0

c  1+1 --> 2
c    (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0 ∧  p_284) -> (-b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0)
c  in CNF:
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_2
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨  b^{4, 72}_1
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ -p_284 ∨ -b^{4, 72}_0
c  in DIMACS:
 7766  7767 -7768 -284 -7769 0
 7766  7767 -7768 -284  7770 0
 7766  7767 -7768 -284 -7771 0

c  2+1 --> break 
c    (-b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧  p_284) -> break
c  in CNF:
c     b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 7766 -7767  7768 -284 1162 0


c  2-1 --> 1
c    (-b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧ -p_284) -> (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0)
c  in CNF:
c     b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_2
c     b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_1
c     b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨  b^{4, 72}_0
c  in DIMACS:
 7766 -7767  7768  284 -7769 0
 7766 -7767  7768  284 -7770 0
 7766 -7767  7768  284  7771 0

c  1-1 --> 0
c    (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0 ∧ -p_284) -> (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧ -b^{4, 72}_0)
c  in CNF:
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_2
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_1
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_0
c  in DIMACS:
 7766  7767 -7768  284 -7769 0
 7766  7767 -7768  284 -7770 0
 7766  7767 -7768  284 -7771 0

c  0-1 --> -1
c    (-b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧ -p_284) -> ( b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0)
c  in CNF:
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨  b^{4, 72}_2
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_1
c     b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨  b^{4, 72}_0
c  in DIMACS:
 7766  7767  7768  284  7769 0
 7766  7767  7768  284 -7770 0
 7766  7767  7768  284  7771 0

c  -1-1 --> -2
c    ( b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧  b^{4, 71}_0 ∧ -p_284) -> ( b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0)
c  in CNF:
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨  b^{4, 72}_2
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨  b^{4, 72}_1
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨  p_284 ∨ -b^{4, 72}_0
c  in DIMACS:
-7766  7767 -7768  284  7769 0
-7766  7767 -7768  284  7770 0
-7766  7767 -7768  284 -7771 0

c  -2-1 --> break 
c    ( b^{4, 71}_2 ∧  b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨  b^{4, 71}_0 ∨  p_284 ∨ break
c  in DIMACS:
-7766 -7767  7768  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 71}_2 ∧ -b^{4, 71}_1 ∧ -b^{4, 71}_0 ∧ true) 
c  in CNF:
c    -b^{4, 71}_2 ∨  b^{4, 71}_1 ∨  b^{4, 71}_0 ∨ false 
c  in DIMACS:
-7766  7767  7768  0

c  3 does not represent an automaton state.
c    -(-b^{4, 71}_2 ∧  b^{4, 71}_1 ∧  b^{4, 71}_0 ∧ true) 
c  in CNF:
c     b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ false 
c  in DIMACS:
 7766 -7767 -7768  0
c  -3 does not represent an automaton state.
c    -( b^{4, 71}_2 ∧  b^{4, 71}_1 ∧  b^{4, 71}_0 ∧ true) 
c  in CNF:
c    -b^{4, 71}_2 ∨ -b^{4, 71}_1 ∨ -b^{4, 71}_0 ∨ false 
c  in DIMACS:
-7766 -7767 -7768  0

c i = 72
c  -2+1 --> -1
c    ( b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧  p_288) -> ( b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0)
c  in CNF:
c    -b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨  b^{4, 73}_2
c    -b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_1
c    -b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨  b^{4, 73}_0
c  in DIMACS:
-7769 -7770  7771 -288  7772 0
-7769 -7770  7771 -288 -7773 0
-7769 -7770  7771 -288  7774 0

c  -1+1 --> 0
c    ( b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0 ∧  p_288) -> (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧ -b^{4, 73}_0)
c  in CNF:
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_2
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_1
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_0
c  in DIMACS:
-7769  7770 -7771 -288 -7772 0
-7769  7770 -7771 -288 -7773 0
-7769  7770 -7771 -288 -7774 0

c  0+1 --> 1
c    (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧  p_288) -> (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0)
c  in CNF:
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_2
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_1
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨  b^{4, 73}_0
c  in DIMACS:
 7769  7770  7771 -288 -7772 0
 7769  7770  7771 -288 -7773 0
 7769  7770  7771 -288  7774 0

c  1+1 --> 2
c    (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0 ∧  p_288) -> (-b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0)
c  in CNF:
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_2
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨  b^{4, 73}_1
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ -p_288 ∨ -b^{4, 73}_0
c  in DIMACS:
 7769  7770 -7771 -288 -7772 0
 7769  7770 -7771 -288  7773 0
 7769  7770 -7771 -288 -7774 0

c  2+1 --> break 
c    (-b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧  p_288) -> break
c  in CNF:
c     b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 7769 -7770  7771 -288 1162 0


c  2-1 --> 1
c    (-b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧ -p_288) -> (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0)
c  in CNF:
c     b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_2
c     b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_1
c     b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨  b^{4, 73}_0
c  in DIMACS:
 7769 -7770  7771  288 -7772 0
 7769 -7770  7771  288 -7773 0
 7769 -7770  7771  288  7774 0

c  1-1 --> 0
c    (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0 ∧ -p_288) -> (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧ -b^{4, 73}_0)
c  in CNF:
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_2
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_1
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_0
c  in DIMACS:
 7769  7770 -7771  288 -7772 0
 7769  7770 -7771  288 -7773 0
 7769  7770 -7771  288 -7774 0

c  0-1 --> -1
c    (-b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧ -p_288) -> ( b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0)
c  in CNF:
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨  b^{4, 73}_2
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_1
c     b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨  b^{4, 73}_0
c  in DIMACS:
 7769  7770  7771  288  7772 0
 7769  7770  7771  288 -7773 0
 7769  7770  7771  288  7774 0

c  -1-1 --> -2
c    ( b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧  b^{4, 72}_0 ∧ -p_288) -> ( b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0)
c  in CNF:
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨  b^{4, 73}_2
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨  b^{4, 73}_1
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨  p_288 ∨ -b^{4, 73}_0
c  in DIMACS:
-7769  7770 -7771  288  7772 0
-7769  7770 -7771  288  7773 0
-7769  7770 -7771  288 -7774 0

c  -2-1 --> break 
c    ( b^{4, 72}_2 ∧  b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨  b^{4, 72}_0 ∨  p_288 ∨ break
c  in DIMACS:
-7769 -7770  7771  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 72}_2 ∧ -b^{4, 72}_1 ∧ -b^{4, 72}_0 ∧ true) 
c  in CNF:
c    -b^{4, 72}_2 ∨  b^{4, 72}_1 ∨  b^{4, 72}_0 ∨ false 
c  in DIMACS:
-7769  7770  7771  0

c  3 does not represent an automaton state.
c    -(-b^{4, 72}_2 ∧  b^{4, 72}_1 ∧  b^{4, 72}_0 ∧ true) 
c  in CNF:
c     b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ false 
c  in DIMACS:
 7769 -7770 -7771  0
c  -3 does not represent an automaton state.
c    -( b^{4, 72}_2 ∧  b^{4, 72}_1 ∧  b^{4, 72}_0 ∧ true) 
c  in CNF:
c    -b^{4, 72}_2 ∨ -b^{4, 72}_1 ∨ -b^{4, 72}_0 ∨ false 
c  in DIMACS:
-7769 -7770 -7771  0

c i = 73
c  -2+1 --> -1
c    ( b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧  p_292) -> ( b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0)
c  in CNF:
c    -b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨  b^{4, 74}_2
c    -b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_1
c    -b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨  b^{4, 74}_0
c  in DIMACS:
-7772 -7773  7774 -292  7775 0
-7772 -7773  7774 -292 -7776 0
-7772 -7773  7774 -292  7777 0

c  -1+1 --> 0
c    ( b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0 ∧  p_292) -> (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧ -b^{4, 74}_0)
c  in CNF:
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_2
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_1
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_0
c  in DIMACS:
-7772  7773 -7774 -292 -7775 0
-7772  7773 -7774 -292 -7776 0
-7772  7773 -7774 -292 -7777 0

c  0+1 --> 1
c    (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧  p_292) -> (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0)
c  in CNF:
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_2
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_1
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨  b^{4, 74}_0
c  in DIMACS:
 7772  7773  7774 -292 -7775 0
 7772  7773  7774 -292 -7776 0
 7772  7773  7774 -292  7777 0

c  1+1 --> 2
c    (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0 ∧  p_292) -> (-b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0)
c  in CNF:
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_2
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨  b^{4, 74}_1
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ -p_292 ∨ -b^{4, 74}_0
c  in DIMACS:
 7772  7773 -7774 -292 -7775 0
 7772  7773 -7774 -292  7776 0
 7772  7773 -7774 -292 -7777 0

c  2+1 --> break 
c    (-b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧  p_292) -> break
c  in CNF:
c     b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 7772 -7773  7774 -292 1162 0


c  2-1 --> 1
c    (-b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧ -p_292) -> (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0)
c  in CNF:
c     b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_2
c     b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_1
c     b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨  b^{4, 74}_0
c  in DIMACS:
 7772 -7773  7774  292 -7775 0
 7772 -7773  7774  292 -7776 0
 7772 -7773  7774  292  7777 0

c  1-1 --> 0
c    (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0 ∧ -p_292) -> (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧ -b^{4, 74}_0)
c  in CNF:
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_2
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_1
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_0
c  in DIMACS:
 7772  7773 -7774  292 -7775 0
 7772  7773 -7774  292 -7776 0
 7772  7773 -7774  292 -7777 0

c  0-1 --> -1
c    (-b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧ -p_292) -> ( b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0)
c  in CNF:
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨  b^{4, 74}_2
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_1
c     b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨  b^{4, 74}_0
c  in DIMACS:
 7772  7773  7774  292  7775 0
 7772  7773  7774  292 -7776 0
 7772  7773  7774  292  7777 0

c  -1-1 --> -2
c    ( b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧  b^{4, 73}_0 ∧ -p_292) -> ( b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0)
c  in CNF:
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨  b^{4, 74}_2
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨  b^{4, 74}_1
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨  p_292 ∨ -b^{4, 74}_0
c  in DIMACS:
-7772  7773 -7774  292  7775 0
-7772  7773 -7774  292  7776 0
-7772  7773 -7774  292 -7777 0

c  -2-1 --> break 
c    ( b^{4, 73}_2 ∧  b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨  b^{4, 73}_0 ∨  p_292 ∨ break
c  in DIMACS:
-7772 -7773  7774  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 73}_2 ∧ -b^{4, 73}_1 ∧ -b^{4, 73}_0 ∧ true) 
c  in CNF:
c    -b^{4, 73}_2 ∨  b^{4, 73}_1 ∨  b^{4, 73}_0 ∨ false 
c  in DIMACS:
-7772  7773  7774  0

c  3 does not represent an automaton state.
c    -(-b^{4, 73}_2 ∧  b^{4, 73}_1 ∧  b^{4, 73}_0 ∧ true) 
c  in CNF:
c     b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ false 
c  in DIMACS:
 7772 -7773 -7774  0
c  -3 does not represent an automaton state.
c    -( b^{4, 73}_2 ∧  b^{4, 73}_1 ∧  b^{4, 73}_0 ∧ true) 
c  in CNF:
c    -b^{4, 73}_2 ∨ -b^{4, 73}_1 ∨ -b^{4, 73}_0 ∨ false 
c  in DIMACS:
-7772 -7773 -7774  0

c i = 74
c  -2+1 --> -1
c    ( b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧  p_296) -> ( b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0)
c  in CNF:
c    -b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨  b^{4, 75}_2
c    -b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_1
c    -b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨  b^{4, 75}_0
c  in DIMACS:
-7775 -7776  7777 -296  7778 0
-7775 -7776  7777 -296 -7779 0
-7775 -7776  7777 -296  7780 0

c  -1+1 --> 0
c    ( b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0 ∧  p_296) -> (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧ -b^{4, 75}_0)
c  in CNF:
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_2
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_1
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_0
c  in DIMACS:
-7775  7776 -7777 -296 -7778 0
-7775  7776 -7777 -296 -7779 0
-7775  7776 -7777 -296 -7780 0

c  0+1 --> 1
c    (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧  p_296) -> (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0)
c  in CNF:
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_2
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_1
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨  b^{4, 75}_0
c  in DIMACS:
 7775  7776  7777 -296 -7778 0
 7775  7776  7777 -296 -7779 0
 7775  7776  7777 -296  7780 0

c  1+1 --> 2
c    (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0 ∧  p_296) -> (-b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0)
c  in CNF:
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_2
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨  b^{4, 75}_1
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ -p_296 ∨ -b^{4, 75}_0
c  in DIMACS:
 7775  7776 -7777 -296 -7778 0
 7775  7776 -7777 -296  7779 0
 7775  7776 -7777 -296 -7780 0

c  2+1 --> break 
c    (-b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧  p_296) -> break
c  in CNF:
c     b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 7775 -7776  7777 -296 1162 0


c  2-1 --> 1
c    (-b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧ -p_296) -> (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0)
c  in CNF:
c     b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_2
c     b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_1
c     b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨  b^{4, 75}_0
c  in DIMACS:
 7775 -7776  7777  296 -7778 0
 7775 -7776  7777  296 -7779 0
 7775 -7776  7777  296  7780 0

c  1-1 --> 0
c    (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0 ∧ -p_296) -> (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧ -b^{4, 75}_0)
c  in CNF:
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_2
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_1
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_0
c  in DIMACS:
 7775  7776 -7777  296 -7778 0
 7775  7776 -7777  296 -7779 0
 7775  7776 -7777  296 -7780 0

c  0-1 --> -1
c    (-b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧ -p_296) -> ( b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0)
c  in CNF:
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨  b^{4, 75}_2
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_1
c     b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨  b^{4, 75}_0
c  in DIMACS:
 7775  7776  7777  296  7778 0
 7775  7776  7777  296 -7779 0
 7775  7776  7777  296  7780 0

c  -1-1 --> -2
c    ( b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧  b^{4, 74}_0 ∧ -p_296) -> ( b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0)
c  in CNF:
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨  b^{4, 75}_2
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨  b^{4, 75}_1
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨  p_296 ∨ -b^{4, 75}_0
c  in DIMACS:
-7775  7776 -7777  296  7778 0
-7775  7776 -7777  296  7779 0
-7775  7776 -7777  296 -7780 0

c  -2-1 --> break 
c    ( b^{4, 74}_2 ∧  b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨  b^{4, 74}_0 ∨  p_296 ∨ break
c  in DIMACS:
-7775 -7776  7777  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 74}_2 ∧ -b^{4, 74}_1 ∧ -b^{4, 74}_0 ∧ true) 
c  in CNF:
c    -b^{4, 74}_2 ∨  b^{4, 74}_1 ∨  b^{4, 74}_0 ∨ false 
c  in DIMACS:
-7775  7776  7777  0

c  3 does not represent an automaton state.
c    -(-b^{4, 74}_2 ∧  b^{4, 74}_1 ∧  b^{4, 74}_0 ∧ true) 
c  in CNF:
c     b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ false 
c  in DIMACS:
 7775 -7776 -7777  0
c  -3 does not represent an automaton state.
c    -( b^{4, 74}_2 ∧  b^{4, 74}_1 ∧  b^{4, 74}_0 ∧ true) 
c  in CNF:
c    -b^{4, 74}_2 ∨ -b^{4, 74}_1 ∨ -b^{4, 74}_0 ∨ false 
c  in DIMACS:
-7775 -7776 -7777  0

c i = 75
c  -2+1 --> -1
c    ( b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧  p_300) -> ( b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0)
c  in CNF:
c    -b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨  b^{4, 76}_2
c    -b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_1
c    -b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨  b^{4, 76}_0
c  in DIMACS:
-7778 -7779  7780 -300  7781 0
-7778 -7779  7780 -300 -7782 0
-7778 -7779  7780 -300  7783 0

c  -1+1 --> 0
c    ( b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0 ∧  p_300) -> (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧ -b^{4, 76}_0)
c  in CNF:
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_2
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_1
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_0
c  in DIMACS:
-7778  7779 -7780 -300 -7781 0
-7778  7779 -7780 -300 -7782 0
-7778  7779 -7780 -300 -7783 0

c  0+1 --> 1
c    (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧  p_300) -> (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0)
c  in CNF:
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_2
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_1
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨  b^{4, 76}_0
c  in DIMACS:
 7778  7779  7780 -300 -7781 0
 7778  7779  7780 -300 -7782 0
 7778  7779  7780 -300  7783 0

c  1+1 --> 2
c    (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0 ∧  p_300) -> (-b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0)
c  in CNF:
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_2
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨  b^{4, 76}_1
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ -p_300 ∨ -b^{4, 76}_0
c  in DIMACS:
 7778  7779 -7780 -300 -7781 0
 7778  7779 -7780 -300  7782 0
 7778  7779 -7780 -300 -7783 0

c  2+1 --> break 
c    (-b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧  p_300) -> break
c  in CNF:
c     b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 7778 -7779  7780 -300 1162 0


c  2-1 --> 1
c    (-b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧ -p_300) -> (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0)
c  in CNF:
c     b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_2
c     b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_1
c     b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨  b^{4, 76}_0
c  in DIMACS:
 7778 -7779  7780  300 -7781 0
 7778 -7779  7780  300 -7782 0
 7778 -7779  7780  300  7783 0

c  1-1 --> 0
c    (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0 ∧ -p_300) -> (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧ -b^{4, 76}_0)
c  in CNF:
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_2
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_1
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_0
c  in DIMACS:
 7778  7779 -7780  300 -7781 0
 7778  7779 -7780  300 -7782 0
 7778  7779 -7780  300 -7783 0

c  0-1 --> -1
c    (-b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧ -p_300) -> ( b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0)
c  in CNF:
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨  b^{4, 76}_2
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_1
c     b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨  b^{4, 76}_0
c  in DIMACS:
 7778  7779  7780  300  7781 0
 7778  7779  7780  300 -7782 0
 7778  7779  7780  300  7783 0

c  -1-1 --> -2
c    ( b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧  b^{4, 75}_0 ∧ -p_300) -> ( b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0)
c  in CNF:
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨  b^{4, 76}_2
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨  b^{4, 76}_1
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨  p_300 ∨ -b^{4, 76}_0
c  in DIMACS:
-7778  7779 -7780  300  7781 0
-7778  7779 -7780  300  7782 0
-7778  7779 -7780  300 -7783 0

c  -2-1 --> break 
c    ( b^{4, 75}_2 ∧  b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨  b^{4, 75}_0 ∨  p_300 ∨ break
c  in DIMACS:
-7778 -7779  7780  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 75}_2 ∧ -b^{4, 75}_1 ∧ -b^{4, 75}_0 ∧ true) 
c  in CNF:
c    -b^{4, 75}_2 ∨  b^{4, 75}_1 ∨  b^{4, 75}_0 ∨ false 
c  in DIMACS:
-7778  7779  7780  0

c  3 does not represent an automaton state.
c    -(-b^{4, 75}_2 ∧  b^{4, 75}_1 ∧  b^{4, 75}_0 ∧ true) 
c  in CNF:
c     b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ false 
c  in DIMACS:
 7778 -7779 -7780  0
c  -3 does not represent an automaton state.
c    -( b^{4, 75}_2 ∧  b^{4, 75}_1 ∧  b^{4, 75}_0 ∧ true) 
c  in CNF:
c    -b^{4, 75}_2 ∨ -b^{4, 75}_1 ∨ -b^{4, 75}_0 ∨ false 
c  in DIMACS:
-7778 -7779 -7780  0

c i = 76
c  -2+1 --> -1
c    ( b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧  p_304) -> ( b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0)
c  in CNF:
c    -b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨  b^{4, 77}_2
c    -b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_1
c    -b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨  b^{4, 77}_0
c  in DIMACS:
-7781 -7782  7783 -304  7784 0
-7781 -7782  7783 -304 -7785 0
-7781 -7782  7783 -304  7786 0

c  -1+1 --> 0
c    ( b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0 ∧  p_304) -> (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧ -b^{4, 77}_0)
c  in CNF:
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_2
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_1
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_0
c  in DIMACS:
-7781  7782 -7783 -304 -7784 0
-7781  7782 -7783 -304 -7785 0
-7781  7782 -7783 -304 -7786 0

c  0+1 --> 1
c    (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧  p_304) -> (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0)
c  in CNF:
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_2
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_1
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨  b^{4, 77}_0
c  in DIMACS:
 7781  7782  7783 -304 -7784 0
 7781  7782  7783 -304 -7785 0
 7781  7782  7783 -304  7786 0

c  1+1 --> 2
c    (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0 ∧  p_304) -> (-b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0)
c  in CNF:
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_2
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨  b^{4, 77}_1
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ -p_304 ∨ -b^{4, 77}_0
c  in DIMACS:
 7781  7782 -7783 -304 -7784 0
 7781  7782 -7783 -304  7785 0
 7781  7782 -7783 -304 -7786 0

c  2+1 --> break 
c    (-b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧  p_304) -> break
c  in CNF:
c     b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 7781 -7782  7783 -304 1162 0


c  2-1 --> 1
c    (-b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧ -p_304) -> (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0)
c  in CNF:
c     b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_2
c     b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_1
c     b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨  b^{4, 77}_0
c  in DIMACS:
 7781 -7782  7783  304 -7784 0
 7781 -7782  7783  304 -7785 0
 7781 -7782  7783  304  7786 0

c  1-1 --> 0
c    (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0 ∧ -p_304) -> (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧ -b^{4, 77}_0)
c  in CNF:
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_2
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_1
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_0
c  in DIMACS:
 7781  7782 -7783  304 -7784 0
 7781  7782 -7783  304 -7785 0
 7781  7782 -7783  304 -7786 0

c  0-1 --> -1
c    (-b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧ -p_304) -> ( b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0)
c  in CNF:
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨  b^{4, 77}_2
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_1
c     b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨  b^{4, 77}_0
c  in DIMACS:
 7781  7782  7783  304  7784 0
 7781  7782  7783  304 -7785 0
 7781  7782  7783  304  7786 0

c  -1-1 --> -2
c    ( b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧  b^{4, 76}_0 ∧ -p_304) -> ( b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0)
c  in CNF:
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨  b^{4, 77}_2
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨  b^{4, 77}_1
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨  p_304 ∨ -b^{4, 77}_0
c  in DIMACS:
-7781  7782 -7783  304  7784 0
-7781  7782 -7783  304  7785 0
-7781  7782 -7783  304 -7786 0

c  -2-1 --> break 
c    ( b^{4, 76}_2 ∧  b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨  b^{4, 76}_0 ∨  p_304 ∨ break
c  in DIMACS:
-7781 -7782  7783  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 76}_2 ∧ -b^{4, 76}_1 ∧ -b^{4, 76}_0 ∧ true) 
c  in CNF:
c    -b^{4, 76}_2 ∨  b^{4, 76}_1 ∨  b^{4, 76}_0 ∨ false 
c  in DIMACS:
-7781  7782  7783  0

c  3 does not represent an automaton state.
c    -(-b^{4, 76}_2 ∧  b^{4, 76}_1 ∧  b^{4, 76}_0 ∧ true) 
c  in CNF:
c     b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ false 
c  in DIMACS:
 7781 -7782 -7783  0
c  -3 does not represent an automaton state.
c    -( b^{4, 76}_2 ∧  b^{4, 76}_1 ∧  b^{4, 76}_0 ∧ true) 
c  in CNF:
c    -b^{4, 76}_2 ∨ -b^{4, 76}_1 ∨ -b^{4, 76}_0 ∨ false 
c  in DIMACS:
-7781 -7782 -7783  0

c i = 77
c  -2+1 --> -1
c    ( b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧  p_308) -> ( b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0)
c  in CNF:
c    -b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨  b^{4, 78}_2
c    -b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_1
c    -b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨  b^{4, 78}_0
c  in DIMACS:
-7784 -7785  7786 -308  7787 0
-7784 -7785  7786 -308 -7788 0
-7784 -7785  7786 -308  7789 0

c  -1+1 --> 0
c    ( b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0 ∧  p_308) -> (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧ -b^{4, 78}_0)
c  in CNF:
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_2
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_1
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_0
c  in DIMACS:
-7784  7785 -7786 -308 -7787 0
-7784  7785 -7786 -308 -7788 0
-7784  7785 -7786 -308 -7789 0

c  0+1 --> 1
c    (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧  p_308) -> (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0)
c  in CNF:
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_2
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_1
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨  b^{4, 78}_0
c  in DIMACS:
 7784  7785  7786 -308 -7787 0
 7784  7785  7786 -308 -7788 0
 7784  7785  7786 -308  7789 0

c  1+1 --> 2
c    (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0 ∧  p_308) -> (-b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0)
c  in CNF:
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_2
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨  b^{4, 78}_1
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ -p_308 ∨ -b^{4, 78}_0
c  in DIMACS:
 7784  7785 -7786 -308 -7787 0
 7784  7785 -7786 -308  7788 0
 7784  7785 -7786 -308 -7789 0

c  2+1 --> break 
c    (-b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧  p_308) -> break
c  in CNF:
c     b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 7784 -7785  7786 -308 1162 0


c  2-1 --> 1
c    (-b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧ -p_308) -> (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0)
c  in CNF:
c     b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_2
c     b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_1
c     b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨  b^{4, 78}_0
c  in DIMACS:
 7784 -7785  7786  308 -7787 0
 7784 -7785  7786  308 -7788 0
 7784 -7785  7786  308  7789 0

c  1-1 --> 0
c    (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0 ∧ -p_308) -> (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧ -b^{4, 78}_0)
c  in CNF:
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_2
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_1
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_0
c  in DIMACS:
 7784  7785 -7786  308 -7787 0
 7784  7785 -7786  308 -7788 0
 7784  7785 -7786  308 -7789 0

c  0-1 --> -1
c    (-b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧ -p_308) -> ( b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0)
c  in CNF:
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨  b^{4, 78}_2
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_1
c     b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨  b^{4, 78}_0
c  in DIMACS:
 7784  7785  7786  308  7787 0
 7784  7785  7786  308 -7788 0
 7784  7785  7786  308  7789 0

c  -1-1 --> -2
c    ( b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧  b^{4, 77}_0 ∧ -p_308) -> ( b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0)
c  in CNF:
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨  b^{4, 78}_2
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨  b^{4, 78}_1
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨  p_308 ∨ -b^{4, 78}_0
c  in DIMACS:
-7784  7785 -7786  308  7787 0
-7784  7785 -7786  308  7788 0
-7784  7785 -7786  308 -7789 0

c  -2-1 --> break 
c    ( b^{4, 77}_2 ∧  b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨  b^{4, 77}_0 ∨  p_308 ∨ break
c  in DIMACS:
-7784 -7785  7786  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 77}_2 ∧ -b^{4, 77}_1 ∧ -b^{4, 77}_0 ∧ true) 
c  in CNF:
c    -b^{4, 77}_2 ∨  b^{4, 77}_1 ∨  b^{4, 77}_0 ∨ false 
c  in DIMACS:
-7784  7785  7786  0

c  3 does not represent an automaton state.
c    -(-b^{4, 77}_2 ∧  b^{4, 77}_1 ∧  b^{4, 77}_0 ∧ true) 
c  in CNF:
c     b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ false 
c  in DIMACS:
 7784 -7785 -7786  0
c  -3 does not represent an automaton state.
c    -( b^{4, 77}_2 ∧  b^{4, 77}_1 ∧  b^{4, 77}_0 ∧ true) 
c  in CNF:
c    -b^{4, 77}_2 ∨ -b^{4, 77}_1 ∨ -b^{4, 77}_0 ∨ false 
c  in DIMACS:
-7784 -7785 -7786  0

c i = 78
c  -2+1 --> -1
c    ( b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧  p_312) -> ( b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0)
c  in CNF:
c    -b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨  b^{4, 79}_2
c    -b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_1
c    -b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨  b^{4, 79}_0
c  in DIMACS:
-7787 -7788  7789 -312  7790 0
-7787 -7788  7789 -312 -7791 0
-7787 -7788  7789 -312  7792 0

c  -1+1 --> 0
c    ( b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0 ∧  p_312) -> (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧ -b^{4, 79}_0)
c  in CNF:
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_2
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_1
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_0
c  in DIMACS:
-7787  7788 -7789 -312 -7790 0
-7787  7788 -7789 -312 -7791 0
-7787  7788 -7789 -312 -7792 0

c  0+1 --> 1
c    (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧  p_312) -> (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0)
c  in CNF:
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_2
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_1
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨  b^{4, 79}_0
c  in DIMACS:
 7787  7788  7789 -312 -7790 0
 7787  7788  7789 -312 -7791 0
 7787  7788  7789 -312  7792 0

c  1+1 --> 2
c    (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0 ∧  p_312) -> (-b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0)
c  in CNF:
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_2
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨  b^{4, 79}_1
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ -p_312 ∨ -b^{4, 79}_0
c  in DIMACS:
 7787  7788 -7789 -312 -7790 0
 7787  7788 -7789 -312  7791 0
 7787  7788 -7789 -312 -7792 0

c  2+1 --> break 
c    (-b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧  p_312) -> break
c  in CNF:
c     b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 7787 -7788  7789 -312 1162 0


c  2-1 --> 1
c    (-b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧ -p_312) -> (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0)
c  in CNF:
c     b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_2
c     b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_1
c     b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨  b^{4, 79}_0
c  in DIMACS:
 7787 -7788  7789  312 -7790 0
 7787 -7788  7789  312 -7791 0
 7787 -7788  7789  312  7792 0

c  1-1 --> 0
c    (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0 ∧ -p_312) -> (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧ -b^{4, 79}_0)
c  in CNF:
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_2
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_1
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_0
c  in DIMACS:
 7787  7788 -7789  312 -7790 0
 7787  7788 -7789  312 -7791 0
 7787  7788 -7789  312 -7792 0

c  0-1 --> -1
c    (-b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧ -p_312) -> ( b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0)
c  in CNF:
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨  b^{4, 79}_2
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_1
c     b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨  b^{4, 79}_0
c  in DIMACS:
 7787  7788  7789  312  7790 0
 7787  7788  7789  312 -7791 0
 7787  7788  7789  312  7792 0

c  -1-1 --> -2
c    ( b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧  b^{4, 78}_0 ∧ -p_312) -> ( b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0)
c  in CNF:
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨  b^{4, 79}_2
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨  b^{4, 79}_1
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨  p_312 ∨ -b^{4, 79}_0
c  in DIMACS:
-7787  7788 -7789  312  7790 0
-7787  7788 -7789  312  7791 0
-7787  7788 -7789  312 -7792 0

c  -2-1 --> break 
c    ( b^{4, 78}_2 ∧  b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨  b^{4, 78}_0 ∨  p_312 ∨ break
c  in DIMACS:
-7787 -7788  7789  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 78}_2 ∧ -b^{4, 78}_1 ∧ -b^{4, 78}_0 ∧ true) 
c  in CNF:
c    -b^{4, 78}_2 ∨  b^{4, 78}_1 ∨  b^{4, 78}_0 ∨ false 
c  in DIMACS:
-7787  7788  7789  0

c  3 does not represent an automaton state.
c    -(-b^{4, 78}_2 ∧  b^{4, 78}_1 ∧  b^{4, 78}_0 ∧ true) 
c  in CNF:
c     b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ false 
c  in DIMACS:
 7787 -7788 -7789  0
c  -3 does not represent an automaton state.
c    -( b^{4, 78}_2 ∧  b^{4, 78}_1 ∧  b^{4, 78}_0 ∧ true) 
c  in CNF:
c    -b^{4, 78}_2 ∨ -b^{4, 78}_1 ∨ -b^{4, 78}_0 ∨ false 
c  in DIMACS:
-7787 -7788 -7789  0

c i = 79
c  -2+1 --> -1
c    ( b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧  p_316) -> ( b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0)
c  in CNF:
c    -b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨  b^{4, 80}_2
c    -b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_1
c    -b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨  b^{4, 80}_0
c  in DIMACS:
-7790 -7791  7792 -316  7793 0
-7790 -7791  7792 -316 -7794 0
-7790 -7791  7792 -316  7795 0

c  -1+1 --> 0
c    ( b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0 ∧  p_316) -> (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧ -b^{4, 80}_0)
c  in CNF:
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_2
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_1
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_0
c  in DIMACS:
-7790  7791 -7792 -316 -7793 0
-7790  7791 -7792 -316 -7794 0
-7790  7791 -7792 -316 -7795 0

c  0+1 --> 1
c    (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧  p_316) -> (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0)
c  in CNF:
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_2
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_1
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨  b^{4, 80}_0
c  in DIMACS:
 7790  7791  7792 -316 -7793 0
 7790  7791  7792 -316 -7794 0
 7790  7791  7792 -316  7795 0

c  1+1 --> 2
c    (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0 ∧  p_316) -> (-b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0)
c  in CNF:
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_2
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨  b^{4, 80}_1
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ -p_316 ∨ -b^{4, 80}_0
c  in DIMACS:
 7790  7791 -7792 -316 -7793 0
 7790  7791 -7792 -316  7794 0
 7790  7791 -7792 -316 -7795 0

c  2+1 --> break 
c    (-b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧  p_316) -> break
c  in CNF:
c     b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 7790 -7791  7792 -316 1162 0


c  2-1 --> 1
c    (-b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧ -p_316) -> (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0)
c  in CNF:
c     b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_2
c     b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_1
c     b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨  b^{4, 80}_0
c  in DIMACS:
 7790 -7791  7792  316 -7793 0
 7790 -7791  7792  316 -7794 0
 7790 -7791  7792  316  7795 0

c  1-1 --> 0
c    (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0 ∧ -p_316) -> (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧ -b^{4, 80}_0)
c  in CNF:
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_2
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_1
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_0
c  in DIMACS:
 7790  7791 -7792  316 -7793 0
 7790  7791 -7792  316 -7794 0
 7790  7791 -7792  316 -7795 0

c  0-1 --> -1
c    (-b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧ -p_316) -> ( b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0)
c  in CNF:
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨  b^{4, 80}_2
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_1
c     b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨  b^{4, 80}_0
c  in DIMACS:
 7790  7791  7792  316  7793 0
 7790  7791  7792  316 -7794 0
 7790  7791  7792  316  7795 0

c  -1-1 --> -2
c    ( b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧  b^{4, 79}_0 ∧ -p_316) -> ( b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0)
c  in CNF:
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨  b^{4, 80}_2
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨  b^{4, 80}_1
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨  p_316 ∨ -b^{4, 80}_0
c  in DIMACS:
-7790  7791 -7792  316  7793 0
-7790  7791 -7792  316  7794 0
-7790  7791 -7792  316 -7795 0

c  -2-1 --> break 
c    ( b^{4, 79}_2 ∧  b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨  b^{4, 79}_0 ∨  p_316 ∨ break
c  in DIMACS:
-7790 -7791  7792  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 79}_2 ∧ -b^{4, 79}_1 ∧ -b^{4, 79}_0 ∧ true) 
c  in CNF:
c    -b^{4, 79}_2 ∨  b^{4, 79}_1 ∨  b^{4, 79}_0 ∨ false 
c  in DIMACS:
-7790  7791  7792  0

c  3 does not represent an automaton state.
c    -(-b^{4, 79}_2 ∧  b^{4, 79}_1 ∧  b^{4, 79}_0 ∧ true) 
c  in CNF:
c     b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ false 
c  in DIMACS:
 7790 -7791 -7792  0
c  -3 does not represent an automaton state.
c    -( b^{4, 79}_2 ∧  b^{4, 79}_1 ∧  b^{4, 79}_0 ∧ true) 
c  in CNF:
c    -b^{4, 79}_2 ∨ -b^{4, 79}_1 ∨ -b^{4, 79}_0 ∨ false 
c  in DIMACS:
-7790 -7791 -7792  0

c i = 80
c  -2+1 --> -1
c    ( b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧  p_320) -> ( b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0)
c  in CNF:
c    -b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨  b^{4, 81}_2
c    -b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_1
c    -b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨  b^{4, 81}_0
c  in DIMACS:
-7793 -7794  7795 -320  7796 0
-7793 -7794  7795 -320 -7797 0
-7793 -7794  7795 -320  7798 0

c  -1+1 --> 0
c    ( b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0 ∧  p_320) -> (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧ -b^{4, 81}_0)
c  in CNF:
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_2
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_1
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_0
c  in DIMACS:
-7793  7794 -7795 -320 -7796 0
-7793  7794 -7795 -320 -7797 0
-7793  7794 -7795 -320 -7798 0

c  0+1 --> 1
c    (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧  p_320) -> (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0)
c  in CNF:
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_2
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_1
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨  b^{4, 81}_0
c  in DIMACS:
 7793  7794  7795 -320 -7796 0
 7793  7794  7795 -320 -7797 0
 7793  7794  7795 -320  7798 0

c  1+1 --> 2
c    (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0 ∧  p_320) -> (-b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0)
c  in CNF:
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_2
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨  b^{4, 81}_1
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ -p_320 ∨ -b^{4, 81}_0
c  in DIMACS:
 7793  7794 -7795 -320 -7796 0
 7793  7794 -7795 -320  7797 0
 7793  7794 -7795 -320 -7798 0

c  2+1 --> break 
c    (-b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧  p_320) -> break
c  in CNF:
c     b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 7793 -7794  7795 -320 1162 0


c  2-1 --> 1
c    (-b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧ -p_320) -> (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0)
c  in CNF:
c     b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_2
c     b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_1
c     b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨  b^{4, 81}_0
c  in DIMACS:
 7793 -7794  7795  320 -7796 0
 7793 -7794  7795  320 -7797 0
 7793 -7794  7795  320  7798 0

c  1-1 --> 0
c    (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0 ∧ -p_320) -> (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧ -b^{4, 81}_0)
c  in CNF:
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_2
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_1
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_0
c  in DIMACS:
 7793  7794 -7795  320 -7796 0
 7793  7794 -7795  320 -7797 0
 7793  7794 -7795  320 -7798 0

c  0-1 --> -1
c    (-b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧ -p_320) -> ( b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0)
c  in CNF:
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨  b^{4, 81}_2
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_1
c     b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨  b^{4, 81}_0
c  in DIMACS:
 7793  7794  7795  320  7796 0
 7793  7794  7795  320 -7797 0
 7793  7794  7795  320  7798 0

c  -1-1 --> -2
c    ( b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧  b^{4, 80}_0 ∧ -p_320) -> ( b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0)
c  in CNF:
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨  b^{4, 81}_2
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨  b^{4, 81}_1
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨  p_320 ∨ -b^{4, 81}_0
c  in DIMACS:
-7793  7794 -7795  320  7796 0
-7793  7794 -7795  320  7797 0
-7793  7794 -7795  320 -7798 0

c  -2-1 --> break 
c    ( b^{4, 80}_2 ∧  b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨  b^{4, 80}_0 ∨  p_320 ∨ break
c  in DIMACS:
-7793 -7794  7795  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 80}_2 ∧ -b^{4, 80}_1 ∧ -b^{4, 80}_0 ∧ true) 
c  in CNF:
c    -b^{4, 80}_2 ∨  b^{4, 80}_1 ∨  b^{4, 80}_0 ∨ false 
c  in DIMACS:
-7793  7794  7795  0

c  3 does not represent an automaton state.
c    -(-b^{4, 80}_2 ∧  b^{4, 80}_1 ∧  b^{4, 80}_0 ∧ true) 
c  in CNF:
c     b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ false 
c  in DIMACS:
 7793 -7794 -7795  0
c  -3 does not represent an automaton state.
c    -( b^{4, 80}_2 ∧  b^{4, 80}_1 ∧  b^{4, 80}_0 ∧ true) 
c  in CNF:
c    -b^{4, 80}_2 ∨ -b^{4, 80}_1 ∨ -b^{4, 80}_0 ∨ false 
c  in DIMACS:
-7793 -7794 -7795  0

c i = 81
c  -2+1 --> -1
c    ( b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧  p_324) -> ( b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0)
c  in CNF:
c    -b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨  b^{4, 82}_2
c    -b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_1
c    -b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨  b^{4, 82}_0
c  in DIMACS:
-7796 -7797  7798 -324  7799 0
-7796 -7797  7798 -324 -7800 0
-7796 -7797  7798 -324  7801 0

c  -1+1 --> 0
c    ( b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0 ∧  p_324) -> (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧ -b^{4, 82}_0)
c  in CNF:
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_2
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_1
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_0
c  in DIMACS:
-7796  7797 -7798 -324 -7799 0
-7796  7797 -7798 -324 -7800 0
-7796  7797 -7798 -324 -7801 0

c  0+1 --> 1
c    (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧  p_324) -> (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0)
c  in CNF:
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_2
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_1
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨  b^{4, 82}_0
c  in DIMACS:
 7796  7797  7798 -324 -7799 0
 7796  7797  7798 -324 -7800 0
 7796  7797  7798 -324  7801 0

c  1+1 --> 2
c    (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0 ∧  p_324) -> (-b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0)
c  in CNF:
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_2
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨  b^{4, 82}_1
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ -p_324 ∨ -b^{4, 82}_0
c  in DIMACS:
 7796  7797 -7798 -324 -7799 0
 7796  7797 -7798 -324  7800 0
 7796  7797 -7798 -324 -7801 0

c  2+1 --> break 
c    (-b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧  p_324) -> break
c  in CNF:
c     b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 7796 -7797  7798 -324 1162 0


c  2-1 --> 1
c    (-b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧ -p_324) -> (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0)
c  in CNF:
c     b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_2
c     b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_1
c     b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨  b^{4, 82}_0
c  in DIMACS:
 7796 -7797  7798  324 -7799 0
 7796 -7797  7798  324 -7800 0
 7796 -7797  7798  324  7801 0

c  1-1 --> 0
c    (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0 ∧ -p_324) -> (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧ -b^{4, 82}_0)
c  in CNF:
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_2
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_1
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_0
c  in DIMACS:
 7796  7797 -7798  324 -7799 0
 7796  7797 -7798  324 -7800 0
 7796  7797 -7798  324 -7801 0

c  0-1 --> -1
c    (-b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧ -p_324) -> ( b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0)
c  in CNF:
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨  b^{4, 82}_2
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_1
c     b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨  b^{4, 82}_0
c  in DIMACS:
 7796  7797  7798  324  7799 0
 7796  7797  7798  324 -7800 0
 7796  7797  7798  324  7801 0

c  -1-1 --> -2
c    ( b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧  b^{4, 81}_0 ∧ -p_324) -> ( b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0)
c  in CNF:
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨  b^{4, 82}_2
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨  b^{4, 82}_1
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨  p_324 ∨ -b^{4, 82}_0
c  in DIMACS:
-7796  7797 -7798  324  7799 0
-7796  7797 -7798  324  7800 0
-7796  7797 -7798  324 -7801 0

c  -2-1 --> break 
c    ( b^{4, 81}_2 ∧  b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨  b^{4, 81}_0 ∨  p_324 ∨ break
c  in DIMACS:
-7796 -7797  7798  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 81}_2 ∧ -b^{4, 81}_1 ∧ -b^{4, 81}_0 ∧ true) 
c  in CNF:
c    -b^{4, 81}_2 ∨  b^{4, 81}_1 ∨  b^{4, 81}_0 ∨ false 
c  in DIMACS:
-7796  7797  7798  0

c  3 does not represent an automaton state.
c    -(-b^{4, 81}_2 ∧  b^{4, 81}_1 ∧  b^{4, 81}_0 ∧ true) 
c  in CNF:
c     b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ false 
c  in DIMACS:
 7796 -7797 -7798  0
c  -3 does not represent an automaton state.
c    -( b^{4, 81}_2 ∧  b^{4, 81}_1 ∧  b^{4, 81}_0 ∧ true) 
c  in CNF:
c    -b^{4, 81}_2 ∨ -b^{4, 81}_1 ∨ -b^{4, 81}_0 ∨ false 
c  in DIMACS:
-7796 -7797 -7798  0

c i = 82
c  -2+1 --> -1
c    ( b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧  p_328) -> ( b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0)
c  in CNF:
c    -b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨  b^{4, 83}_2
c    -b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_1
c    -b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨  b^{4, 83}_0
c  in DIMACS:
-7799 -7800  7801 -328  7802 0
-7799 -7800  7801 -328 -7803 0
-7799 -7800  7801 -328  7804 0

c  -1+1 --> 0
c    ( b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0 ∧  p_328) -> (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧ -b^{4, 83}_0)
c  in CNF:
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_2
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_1
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_0
c  in DIMACS:
-7799  7800 -7801 -328 -7802 0
-7799  7800 -7801 -328 -7803 0
-7799  7800 -7801 -328 -7804 0

c  0+1 --> 1
c    (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧  p_328) -> (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0)
c  in CNF:
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_2
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_1
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨  b^{4, 83}_0
c  in DIMACS:
 7799  7800  7801 -328 -7802 0
 7799  7800  7801 -328 -7803 0
 7799  7800  7801 -328  7804 0

c  1+1 --> 2
c    (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0 ∧  p_328) -> (-b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0)
c  in CNF:
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_2
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨  b^{4, 83}_1
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ -p_328 ∨ -b^{4, 83}_0
c  in DIMACS:
 7799  7800 -7801 -328 -7802 0
 7799  7800 -7801 -328  7803 0
 7799  7800 -7801 -328 -7804 0

c  2+1 --> break 
c    (-b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧  p_328) -> break
c  in CNF:
c     b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 7799 -7800  7801 -328 1162 0


c  2-1 --> 1
c    (-b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧ -p_328) -> (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0)
c  in CNF:
c     b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_2
c     b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_1
c     b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨  b^{4, 83}_0
c  in DIMACS:
 7799 -7800  7801  328 -7802 0
 7799 -7800  7801  328 -7803 0
 7799 -7800  7801  328  7804 0

c  1-1 --> 0
c    (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0 ∧ -p_328) -> (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧ -b^{4, 83}_0)
c  in CNF:
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_2
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_1
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_0
c  in DIMACS:
 7799  7800 -7801  328 -7802 0
 7799  7800 -7801  328 -7803 0
 7799  7800 -7801  328 -7804 0

c  0-1 --> -1
c    (-b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧ -p_328) -> ( b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0)
c  in CNF:
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨  b^{4, 83}_2
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_1
c     b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨  b^{4, 83}_0
c  in DIMACS:
 7799  7800  7801  328  7802 0
 7799  7800  7801  328 -7803 0
 7799  7800  7801  328  7804 0

c  -1-1 --> -2
c    ( b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧  b^{4, 82}_0 ∧ -p_328) -> ( b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0)
c  in CNF:
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨  b^{4, 83}_2
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨  b^{4, 83}_1
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨  p_328 ∨ -b^{4, 83}_0
c  in DIMACS:
-7799  7800 -7801  328  7802 0
-7799  7800 -7801  328  7803 0
-7799  7800 -7801  328 -7804 0

c  -2-1 --> break 
c    ( b^{4, 82}_2 ∧  b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨  b^{4, 82}_0 ∨  p_328 ∨ break
c  in DIMACS:
-7799 -7800  7801  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 82}_2 ∧ -b^{4, 82}_1 ∧ -b^{4, 82}_0 ∧ true) 
c  in CNF:
c    -b^{4, 82}_2 ∨  b^{4, 82}_1 ∨  b^{4, 82}_0 ∨ false 
c  in DIMACS:
-7799  7800  7801  0

c  3 does not represent an automaton state.
c    -(-b^{4, 82}_2 ∧  b^{4, 82}_1 ∧  b^{4, 82}_0 ∧ true) 
c  in CNF:
c     b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ false 
c  in DIMACS:
 7799 -7800 -7801  0
c  -3 does not represent an automaton state.
c    -( b^{4, 82}_2 ∧  b^{4, 82}_1 ∧  b^{4, 82}_0 ∧ true) 
c  in CNF:
c    -b^{4, 82}_2 ∨ -b^{4, 82}_1 ∨ -b^{4, 82}_0 ∨ false 
c  in DIMACS:
-7799 -7800 -7801  0

c i = 83
c  -2+1 --> -1
c    ( b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧  p_332) -> ( b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0)
c  in CNF:
c    -b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨  b^{4, 84}_2
c    -b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_1
c    -b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨  b^{4, 84}_0
c  in DIMACS:
-7802 -7803  7804 -332  7805 0
-7802 -7803  7804 -332 -7806 0
-7802 -7803  7804 -332  7807 0

c  -1+1 --> 0
c    ( b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0 ∧  p_332) -> (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧ -b^{4, 84}_0)
c  in CNF:
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_2
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_1
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_0
c  in DIMACS:
-7802  7803 -7804 -332 -7805 0
-7802  7803 -7804 -332 -7806 0
-7802  7803 -7804 -332 -7807 0

c  0+1 --> 1
c    (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧  p_332) -> (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0)
c  in CNF:
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_2
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_1
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨  b^{4, 84}_0
c  in DIMACS:
 7802  7803  7804 -332 -7805 0
 7802  7803  7804 -332 -7806 0
 7802  7803  7804 -332  7807 0

c  1+1 --> 2
c    (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0 ∧  p_332) -> (-b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0)
c  in CNF:
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_2
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨  b^{4, 84}_1
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ -p_332 ∨ -b^{4, 84}_0
c  in DIMACS:
 7802  7803 -7804 -332 -7805 0
 7802  7803 -7804 -332  7806 0
 7802  7803 -7804 -332 -7807 0

c  2+1 --> break 
c    (-b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧  p_332) -> break
c  in CNF:
c     b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 7802 -7803  7804 -332 1162 0


c  2-1 --> 1
c    (-b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧ -p_332) -> (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0)
c  in CNF:
c     b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_2
c     b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_1
c     b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨  b^{4, 84}_0
c  in DIMACS:
 7802 -7803  7804  332 -7805 0
 7802 -7803  7804  332 -7806 0
 7802 -7803  7804  332  7807 0

c  1-1 --> 0
c    (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0 ∧ -p_332) -> (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧ -b^{4, 84}_0)
c  in CNF:
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_2
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_1
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_0
c  in DIMACS:
 7802  7803 -7804  332 -7805 0
 7802  7803 -7804  332 -7806 0
 7802  7803 -7804  332 -7807 0

c  0-1 --> -1
c    (-b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧ -p_332) -> ( b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0)
c  in CNF:
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨  b^{4, 84}_2
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_1
c     b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨  b^{4, 84}_0
c  in DIMACS:
 7802  7803  7804  332  7805 0
 7802  7803  7804  332 -7806 0
 7802  7803  7804  332  7807 0

c  -1-1 --> -2
c    ( b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧  b^{4, 83}_0 ∧ -p_332) -> ( b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0)
c  in CNF:
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨  b^{4, 84}_2
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨  b^{4, 84}_1
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨  p_332 ∨ -b^{4, 84}_0
c  in DIMACS:
-7802  7803 -7804  332  7805 0
-7802  7803 -7804  332  7806 0
-7802  7803 -7804  332 -7807 0

c  -2-1 --> break 
c    ( b^{4, 83}_2 ∧  b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨  b^{4, 83}_0 ∨  p_332 ∨ break
c  in DIMACS:
-7802 -7803  7804  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 83}_2 ∧ -b^{4, 83}_1 ∧ -b^{4, 83}_0 ∧ true) 
c  in CNF:
c    -b^{4, 83}_2 ∨  b^{4, 83}_1 ∨  b^{4, 83}_0 ∨ false 
c  in DIMACS:
-7802  7803  7804  0

c  3 does not represent an automaton state.
c    -(-b^{4, 83}_2 ∧  b^{4, 83}_1 ∧  b^{4, 83}_0 ∧ true) 
c  in CNF:
c     b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ false 
c  in DIMACS:
 7802 -7803 -7804  0
c  -3 does not represent an automaton state.
c    -( b^{4, 83}_2 ∧  b^{4, 83}_1 ∧  b^{4, 83}_0 ∧ true) 
c  in CNF:
c    -b^{4, 83}_2 ∨ -b^{4, 83}_1 ∨ -b^{4, 83}_0 ∨ false 
c  in DIMACS:
-7802 -7803 -7804  0

c i = 84
c  -2+1 --> -1
c    ( b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧  p_336) -> ( b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0)
c  in CNF:
c    -b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨  b^{4, 85}_2
c    -b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_1
c    -b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨  b^{4, 85}_0
c  in DIMACS:
-7805 -7806  7807 -336  7808 0
-7805 -7806  7807 -336 -7809 0
-7805 -7806  7807 -336  7810 0

c  -1+1 --> 0
c    ( b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0 ∧  p_336) -> (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧ -b^{4, 85}_0)
c  in CNF:
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_2
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_1
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_0
c  in DIMACS:
-7805  7806 -7807 -336 -7808 0
-7805  7806 -7807 -336 -7809 0
-7805  7806 -7807 -336 -7810 0

c  0+1 --> 1
c    (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧  p_336) -> (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0)
c  in CNF:
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_2
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_1
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨  b^{4, 85}_0
c  in DIMACS:
 7805  7806  7807 -336 -7808 0
 7805  7806  7807 -336 -7809 0
 7805  7806  7807 -336  7810 0

c  1+1 --> 2
c    (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0 ∧  p_336) -> (-b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0)
c  in CNF:
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_2
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨  b^{4, 85}_1
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ -p_336 ∨ -b^{4, 85}_0
c  in DIMACS:
 7805  7806 -7807 -336 -7808 0
 7805  7806 -7807 -336  7809 0
 7805  7806 -7807 -336 -7810 0

c  2+1 --> break 
c    (-b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧  p_336) -> break
c  in CNF:
c     b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 7805 -7806  7807 -336 1162 0


c  2-1 --> 1
c    (-b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧ -p_336) -> (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0)
c  in CNF:
c     b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_2
c     b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_1
c     b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨  b^{4, 85}_0
c  in DIMACS:
 7805 -7806  7807  336 -7808 0
 7805 -7806  7807  336 -7809 0
 7805 -7806  7807  336  7810 0

c  1-1 --> 0
c    (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0 ∧ -p_336) -> (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧ -b^{4, 85}_0)
c  in CNF:
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_2
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_1
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_0
c  in DIMACS:
 7805  7806 -7807  336 -7808 0
 7805  7806 -7807  336 -7809 0
 7805  7806 -7807  336 -7810 0

c  0-1 --> -1
c    (-b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧ -p_336) -> ( b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0)
c  in CNF:
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨  b^{4, 85}_2
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_1
c     b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨  b^{4, 85}_0
c  in DIMACS:
 7805  7806  7807  336  7808 0
 7805  7806  7807  336 -7809 0
 7805  7806  7807  336  7810 0

c  -1-1 --> -2
c    ( b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧  b^{4, 84}_0 ∧ -p_336) -> ( b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0)
c  in CNF:
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨  b^{4, 85}_2
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨  b^{4, 85}_1
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨  p_336 ∨ -b^{4, 85}_0
c  in DIMACS:
-7805  7806 -7807  336  7808 0
-7805  7806 -7807  336  7809 0
-7805  7806 -7807  336 -7810 0

c  -2-1 --> break 
c    ( b^{4, 84}_2 ∧  b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨  b^{4, 84}_0 ∨  p_336 ∨ break
c  in DIMACS:
-7805 -7806  7807  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 84}_2 ∧ -b^{4, 84}_1 ∧ -b^{4, 84}_0 ∧ true) 
c  in CNF:
c    -b^{4, 84}_2 ∨  b^{4, 84}_1 ∨  b^{4, 84}_0 ∨ false 
c  in DIMACS:
-7805  7806  7807  0

c  3 does not represent an automaton state.
c    -(-b^{4, 84}_2 ∧  b^{4, 84}_1 ∧  b^{4, 84}_0 ∧ true) 
c  in CNF:
c     b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ false 
c  in DIMACS:
 7805 -7806 -7807  0
c  -3 does not represent an automaton state.
c    -( b^{4, 84}_2 ∧  b^{4, 84}_1 ∧  b^{4, 84}_0 ∧ true) 
c  in CNF:
c    -b^{4, 84}_2 ∨ -b^{4, 84}_1 ∨ -b^{4, 84}_0 ∨ false 
c  in DIMACS:
-7805 -7806 -7807  0

c i = 85
c  -2+1 --> -1
c    ( b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧  p_340) -> ( b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0)
c  in CNF:
c    -b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨  b^{4, 86}_2
c    -b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_1
c    -b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨  b^{4, 86}_0
c  in DIMACS:
-7808 -7809  7810 -340  7811 0
-7808 -7809  7810 -340 -7812 0
-7808 -7809  7810 -340  7813 0

c  -1+1 --> 0
c    ( b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0 ∧  p_340) -> (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧ -b^{4, 86}_0)
c  in CNF:
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_2
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_1
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_0
c  in DIMACS:
-7808  7809 -7810 -340 -7811 0
-7808  7809 -7810 -340 -7812 0
-7808  7809 -7810 -340 -7813 0

c  0+1 --> 1
c    (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧  p_340) -> (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0)
c  in CNF:
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_2
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_1
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨  b^{4, 86}_0
c  in DIMACS:
 7808  7809  7810 -340 -7811 0
 7808  7809  7810 -340 -7812 0
 7808  7809  7810 -340  7813 0

c  1+1 --> 2
c    (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0 ∧  p_340) -> (-b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0)
c  in CNF:
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_2
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨  b^{4, 86}_1
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ -p_340 ∨ -b^{4, 86}_0
c  in DIMACS:
 7808  7809 -7810 -340 -7811 0
 7808  7809 -7810 -340  7812 0
 7808  7809 -7810 -340 -7813 0

c  2+1 --> break 
c    (-b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧  p_340) -> break
c  in CNF:
c     b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 7808 -7809  7810 -340 1162 0


c  2-1 --> 1
c    (-b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧ -p_340) -> (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0)
c  in CNF:
c     b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_2
c     b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_1
c     b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨  b^{4, 86}_0
c  in DIMACS:
 7808 -7809  7810  340 -7811 0
 7808 -7809  7810  340 -7812 0
 7808 -7809  7810  340  7813 0

c  1-1 --> 0
c    (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0 ∧ -p_340) -> (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧ -b^{4, 86}_0)
c  in CNF:
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_2
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_1
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_0
c  in DIMACS:
 7808  7809 -7810  340 -7811 0
 7808  7809 -7810  340 -7812 0
 7808  7809 -7810  340 -7813 0

c  0-1 --> -1
c    (-b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧ -p_340) -> ( b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0)
c  in CNF:
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨  b^{4, 86}_2
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_1
c     b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨  b^{4, 86}_0
c  in DIMACS:
 7808  7809  7810  340  7811 0
 7808  7809  7810  340 -7812 0
 7808  7809  7810  340  7813 0

c  -1-1 --> -2
c    ( b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧  b^{4, 85}_0 ∧ -p_340) -> ( b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0)
c  in CNF:
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨  b^{4, 86}_2
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨  b^{4, 86}_1
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨  p_340 ∨ -b^{4, 86}_0
c  in DIMACS:
-7808  7809 -7810  340  7811 0
-7808  7809 -7810  340  7812 0
-7808  7809 -7810  340 -7813 0

c  -2-1 --> break 
c    ( b^{4, 85}_2 ∧  b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨  b^{4, 85}_0 ∨  p_340 ∨ break
c  in DIMACS:
-7808 -7809  7810  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 85}_2 ∧ -b^{4, 85}_1 ∧ -b^{4, 85}_0 ∧ true) 
c  in CNF:
c    -b^{4, 85}_2 ∨  b^{4, 85}_1 ∨  b^{4, 85}_0 ∨ false 
c  in DIMACS:
-7808  7809  7810  0

c  3 does not represent an automaton state.
c    -(-b^{4, 85}_2 ∧  b^{4, 85}_1 ∧  b^{4, 85}_0 ∧ true) 
c  in CNF:
c     b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ false 
c  in DIMACS:
 7808 -7809 -7810  0
c  -3 does not represent an automaton state.
c    -( b^{4, 85}_2 ∧  b^{4, 85}_1 ∧  b^{4, 85}_0 ∧ true) 
c  in CNF:
c    -b^{4, 85}_2 ∨ -b^{4, 85}_1 ∨ -b^{4, 85}_0 ∨ false 
c  in DIMACS:
-7808 -7809 -7810  0

c i = 86
c  -2+1 --> -1
c    ( b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧  p_344) -> ( b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0)
c  in CNF:
c    -b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨  b^{4, 87}_2
c    -b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_1
c    -b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨  b^{4, 87}_0
c  in DIMACS:
-7811 -7812  7813 -344  7814 0
-7811 -7812  7813 -344 -7815 0
-7811 -7812  7813 -344  7816 0

c  -1+1 --> 0
c    ( b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0 ∧  p_344) -> (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧ -b^{4, 87}_0)
c  in CNF:
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_2
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_1
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_0
c  in DIMACS:
-7811  7812 -7813 -344 -7814 0
-7811  7812 -7813 -344 -7815 0
-7811  7812 -7813 -344 -7816 0

c  0+1 --> 1
c    (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧  p_344) -> (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0)
c  in CNF:
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_2
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_1
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨  b^{4, 87}_0
c  in DIMACS:
 7811  7812  7813 -344 -7814 0
 7811  7812  7813 -344 -7815 0
 7811  7812  7813 -344  7816 0

c  1+1 --> 2
c    (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0 ∧  p_344) -> (-b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0)
c  in CNF:
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_2
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨  b^{4, 87}_1
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ -p_344 ∨ -b^{4, 87}_0
c  in DIMACS:
 7811  7812 -7813 -344 -7814 0
 7811  7812 -7813 -344  7815 0
 7811  7812 -7813 -344 -7816 0

c  2+1 --> break 
c    (-b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧  p_344) -> break
c  in CNF:
c     b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 7811 -7812  7813 -344 1162 0


c  2-1 --> 1
c    (-b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧ -p_344) -> (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0)
c  in CNF:
c     b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_2
c     b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_1
c     b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨  b^{4, 87}_0
c  in DIMACS:
 7811 -7812  7813  344 -7814 0
 7811 -7812  7813  344 -7815 0
 7811 -7812  7813  344  7816 0

c  1-1 --> 0
c    (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0 ∧ -p_344) -> (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧ -b^{4, 87}_0)
c  in CNF:
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_2
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_1
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_0
c  in DIMACS:
 7811  7812 -7813  344 -7814 0
 7811  7812 -7813  344 -7815 0
 7811  7812 -7813  344 -7816 0

c  0-1 --> -1
c    (-b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧ -p_344) -> ( b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0)
c  in CNF:
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨  b^{4, 87}_2
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_1
c     b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨  b^{4, 87}_0
c  in DIMACS:
 7811  7812  7813  344  7814 0
 7811  7812  7813  344 -7815 0
 7811  7812  7813  344  7816 0

c  -1-1 --> -2
c    ( b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧  b^{4, 86}_0 ∧ -p_344) -> ( b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0)
c  in CNF:
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨  b^{4, 87}_2
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨  b^{4, 87}_1
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨  p_344 ∨ -b^{4, 87}_0
c  in DIMACS:
-7811  7812 -7813  344  7814 0
-7811  7812 -7813  344  7815 0
-7811  7812 -7813  344 -7816 0

c  -2-1 --> break 
c    ( b^{4, 86}_2 ∧  b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨  b^{4, 86}_0 ∨  p_344 ∨ break
c  in DIMACS:
-7811 -7812  7813  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 86}_2 ∧ -b^{4, 86}_1 ∧ -b^{4, 86}_0 ∧ true) 
c  in CNF:
c    -b^{4, 86}_2 ∨  b^{4, 86}_1 ∨  b^{4, 86}_0 ∨ false 
c  in DIMACS:
-7811  7812  7813  0

c  3 does not represent an automaton state.
c    -(-b^{4, 86}_2 ∧  b^{4, 86}_1 ∧  b^{4, 86}_0 ∧ true) 
c  in CNF:
c     b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ false 
c  in DIMACS:
 7811 -7812 -7813  0
c  -3 does not represent an automaton state.
c    -( b^{4, 86}_2 ∧  b^{4, 86}_1 ∧  b^{4, 86}_0 ∧ true) 
c  in CNF:
c    -b^{4, 86}_2 ∨ -b^{4, 86}_1 ∨ -b^{4, 86}_0 ∨ false 
c  in DIMACS:
-7811 -7812 -7813  0

c i = 87
c  -2+1 --> -1
c    ( b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧  p_348) -> ( b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0)
c  in CNF:
c    -b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨  b^{4, 88}_2
c    -b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_1
c    -b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨  b^{4, 88}_0
c  in DIMACS:
-7814 -7815  7816 -348  7817 0
-7814 -7815  7816 -348 -7818 0
-7814 -7815  7816 -348  7819 0

c  -1+1 --> 0
c    ( b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0 ∧  p_348) -> (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧ -b^{4, 88}_0)
c  in CNF:
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_2
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_1
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_0
c  in DIMACS:
-7814  7815 -7816 -348 -7817 0
-7814  7815 -7816 -348 -7818 0
-7814  7815 -7816 -348 -7819 0

c  0+1 --> 1
c    (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧  p_348) -> (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0)
c  in CNF:
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_2
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_1
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨  b^{4, 88}_0
c  in DIMACS:
 7814  7815  7816 -348 -7817 0
 7814  7815  7816 -348 -7818 0
 7814  7815  7816 -348  7819 0

c  1+1 --> 2
c    (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0 ∧  p_348) -> (-b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0)
c  in CNF:
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_2
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨  b^{4, 88}_1
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ -p_348 ∨ -b^{4, 88}_0
c  in DIMACS:
 7814  7815 -7816 -348 -7817 0
 7814  7815 -7816 -348  7818 0
 7814  7815 -7816 -348 -7819 0

c  2+1 --> break 
c    (-b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧  p_348) -> break
c  in CNF:
c     b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 7814 -7815  7816 -348 1162 0


c  2-1 --> 1
c    (-b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧ -p_348) -> (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0)
c  in CNF:
c     b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_2
c     b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_1
c     b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨  b^{4, 88}_0
c  in DIMACS:
 7814 -7815  7816  348 -7817 0
 7814 -7815  7816  348 -7818 0
 7814 -7815  7816  348  7819 0

c  1-1 --> 0
c    (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0 ∧ -p_348) -> (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧ -b^{4, 88}_0)
c  in CNF:
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_2
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_1
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_0
c  in DIMACS:
 7814  7815 -7816  348 -7817 0
 7814  7815 -7816  348 -7818 0
 7814  7815 -7816  348 -7819 0

c  0-1 --> -1
c    (-b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧ -p_348) -> ( b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0)
c  in CNF:
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨  b^{4, 88}_2
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_1
c     b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨  b^{4, 88}_0
c  in DIMACS:
 7814  7815  7816  348  7817 0
 7814  7815  7816  348 -7818 0
 7814  7815  7816  348  7819 0

c  -1-1 --> -2
c    ( b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧  b^{4, 87}_0 ∧ -p_348) -> ( b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0)
c  in CNF:
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨  b^{4, 88}_2
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨  b^{4, 88}_1
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨  p_348 ∨ -b^{4, 88}_0
c  in DIMACS:
-7814  7815 -7816  348  7817 0
-7814  7815 -7816  348  7818 0
-7814  7815 -7816  348 -7819 0

c  -2-1 --> break 
c    ( b^{4, 87}_2 ∧  b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨  b^{4, 87}_0 ∨  p_348 ∨ break
c  in DIMACS:
-7814 -7815  7816  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 87}_2 ∧ -b^{4, 87}_1 ∧ -b^{4, 87}_0 ∧ true) 
c  in CNF:
c    -b^{4, 87}_2 ∨  b^{4, 87}_1 ∨  b^{4, 87}_0 ∨ false 
c  in DIMACS:
-7814  7815  7816  0

c  3 does not represent an automaton state.
c    -(-b^{4, 87}_2 ∧  b^{4, 87}_1 ∧  b^{4, 87}_0 ∧ true) 
c  in CNF:
c     b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ false 
c  in DIMACS:
 7814 -7815 -7816  0
c  -3 does not represent an automaton state.
c    -( b^{4, 87}_2 ∧  b^{4, 87}_1 ∧  b^{4, 87}_0 ∧ true) 
c  in CNF:
c    -b^{4, 87}_2 ∨ -b^{4, 87}_1 ∨ -b^{4, 87}_0 ∨ false 
c  in DIMACS:
-7814 -7815 -7816  0

c i = 88
c  -2+1 --> -1
c    ( b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧  p_352) -> ( b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0)
c  in CNF:
c    -b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨  b^{4, 89}_2
c    -b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_1
c    -b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨  b^{4, 89}_0
c  in DIMACS:
-7817 -7818  7819 -352  7820 0
-7817 -7818  7819 -352 -7821 0
-7817 -7818  7819 -352  7822 0

c  -1+1 --> 0
c    ( b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0 ∧  p_352) -> (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧ -b^{4, 89}_0)
c  in CNF:
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_2
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_1
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_0
c  in DIMACS:
-7817  7818 -7819 -352 -7820 0
-7817  7818 -7819 -352 -7821 0
-7817  7818 -7819 -352 -7822 0

c  0+1 --> 1
c    (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧  p_352) -> (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0)
c  in CNF:
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_2
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_1
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨  b^{4, 89}_0
c  in DIMACS:
 7817  7818  7819 -352 -7820 0
 7817  7818  7819 -352 -7821 0
 7817  7818  7819 -352  7822 0

c  1+1 --> 2
c    (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0 ∧  p_352) -> (-b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0)
c  in CNF:
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_2
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨  b^{4, 89}_1
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ -p_352 ∨ -b^{4, 89}_0
c  in DIMACS:
 7817  7818 -7819 -352 -7820 0
 7817  7818 -7819 -352  7821 0
 7817  7818 -7819 -352 -7822 0

c  2+1 --> break 
c    (-b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧  p_352) -> break
c  in CNF:
c     b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 7817 -7818  7819 -352 1162 0


c  2-1 --> 1
c    (-b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧ -p_352) -> (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0)
c  in CNF:
c     b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_2
c     b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_1
c     b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨  b^{4, 89}_0
c  in DIMACS:
 7817 -7818  7819  352 -7820 0
 7817 -7818  7819  352 -7821 0
 7817 -7818  7819  352  7822 0

c  1-1 --> 0
c    (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0 ∧ -p_352) -> (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧ -b^{4, 89}_0)
c  in CNF:
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_2
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_1
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_0
c  in DIMACS:
 7817  7818 -7819  352 -7820 0
 7817  7818 -7819  352 -7821 0
 7817  7818 -7819  352 -7822 0

c  0-1 --> -1
c    (-b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧ -p_352) -> ( b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0)
c  in CNF:
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨  b^{4, 89}_2
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_1
c     b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨  b^{4, 89}_0
c  in DIMACS:
 7817  7818  7819  352  7820 0
 7817  7818  7819  352 -7821 0
 7817  7818  7819  352  7822 0

c  -1-1 --> -2
c    ( b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧  b^{4, 88}_0 ∧ -p_352) -> ( b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0)
c  in CNF:
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨  b^{4, 89}_2
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨  b^{4, 89}_1
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨  p_352 ∨ -b^{4, 89}_0
c  in DIMACS:
-7817  7818 -7819  352  7820 0
-7817  7818 -7819  352  7821 0
-7817  7818 -7819  352 -7822 0

c  -2-1 --> break 
c    ( b^{4, 88}_2 ∧  b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨  b^{4, 88}_0 ∨  p_352 ∨ break
c  in DIMACS:
-7817 -7818  7819  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 88}_2 ∧ -b^{4, 88}_1 ∧ -b^{4, 88}_0 ∧ true) 
c  in CNF:
c    -b^{4, 88}_2 ∨  b^{4, 88}_1 ∨  b^{4, 88}_0 ∨ false 
c  in DIMACS:
-7817  7818  7819  0

c  3 does not represent an automaton state.
c    -(-b^{4, 88}_2 ∧  b^{4, 88}_1 ∧  b^{4, 88}_0 ∧ true) 
c  in CNF:
c     b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ false 
c  in DIMACS:
 7817 -7818 -7819  0
c  -3 does not represent an automaton state.
c    -( b^{4, 88}_2 ∧  b^{4, 88}_1 ∧  b^{4, 88}_0 ∧ true) 
c  in CNF:
c    -b^{4, 88}_2 ∨ -b^{4, 88}_1 ∨ -b^{4, 88}_0 ∨ false 
c  in DIMACS:
-7817 -7818 -7819  0

c i = 89
c  -2+1 --> -1
c    ( b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧  p_356) -> ( b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0)
c  in CNF:
c    -b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨  b^{4, 90}_2
c    -b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_1
c    -b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨  b^{4, 90}_0
c  in DIMACS:
-7820 -7821  7822 -356  7823 0
-7820 -7821  7822 -356 -7824 0
-7820 -7821  7822 -356  7825 0

c  -1+1 --> 0
c    ( b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0 ∧  p_356) -> (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧ -b^{4, 90}_0)
c  in CNF:
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_2
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_1
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_0
c  in DIMACS:
-7820  7821 -7822 -356 -7823 0
-7820  7821 -7822 -356 -7824 0
-7820  7821 -7822 -356 -7825 0

c  0+1 --> 1
c    (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧  p_356) -> (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0)
c  in CNF:
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_2
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_1
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨  b^{4, 90}_0
c  in DIMACS:
 7820  7821  7822 -356 -7823 0
 7820  7821  7822 -356 -7824 0
 7820  7821  7822 -356  7825 0

c  1+1 --> 2
c    (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0 ∧  p_356) -> (-b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0)
c  in CNF:
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_2
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨  b^{4, 90}_1
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ -p_356 ∨ -b^{4, 90}_0
c  in DIMACS:
 7820  7821 -7822 -356 -7823 0
 7820  7821 -7822 -356  7824 0
 7820  7821 -7822 -356 -7825 0

c  2+1 --> break 
c    (-b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧  p_356) -> break
c  in CNF:
c     b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 7820 -7821  7822 -356 1162 0


c  2-1 --> 1
c    (-b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧ -p_356) -> (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0)
c  in CNF:
c     b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_2
c     b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_1
c     b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨  b^{4, 90}_0
c  in DIMACS:
 7820 -7821  7822  356 -7823 0
 7820 -7821  7822  356 -7824 0
 7820 -7821  7822  356  7825 0

c  1-1 --> 0
c    (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0 ∧ -p_356) -> (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧ -b^{4, 90}_0)
c  in CNF:
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_2
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_1
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_0
c  in DIMACS:
 7820  7821 -7822  356 -7823 0
 7820  7821 -7822  356 -7824 0
 7820  7821 -7822  356 -7825 0

c  0-1 --> -1
c    (-b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧ -p_356) -> ( b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0)
c  in CNF:
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨  b^{4, 90}_2
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_1
c     b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨  b^{4, 90}_0
c  in DIMACS:
 7820  7821  7822  356  7823 0
 7820  7821  7822  356 -7824 0
 7820  7821  7822  356  7825 0

c  -1-1 --> -2
c    ( b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧  b^{4, 89}_0 ∧ -p_356) -> ( b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0)
c  in CNF:
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨  b^{4, 90}_2
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨  b^{4, 90}_1
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨  p_356 ∨ -b^{4, 90}_0
c  in DIMACS:
-7820  7821 -7822  356  7823 0
-7820  7821 -7822  356  7824 0
-7820  7821 -7822  356 -7825 0

c  -2-1 --> break 
c    ( b^{4, 89}_2 ∧  b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨  b^{4, 89}_0 ∨  p_356 ∨ break
c  in DIMACS:
-7820 -7821  7822  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 89}_2 ∧ -b^{4, 89}_1 ∧ -b^{4, 89}_0 ∧ true) 
c  in CNF:
c    -b^{4, 89}_2 ∨  b^{4, 89}_1 ∨  b^{4, 89}_0 ∨ false 
c  in DIMACS:
-7820  7821  7822  0

c  3 does not represent an automaton state.
c    -(-b^{4, 89}_2 ∧  b^{4, 89}_1 ∧  b^{4, 89}_0 ∧ true) 
c  in CNF:
c     b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ false 
c  in DIMACS:
 7820 -7821 -7822  0
c  -3 does not represent an automaton state.
c    -( b^{4, 89}_2 ∧  b^{4, 89}_1 ∧  b^{4, 89}_0 ∧ true) 
c  in CNF:
c    -b^{4, 89}_2 ∨ -b^{4, 89}_1 ∨ -b^{4, 89}_0 ∨ false 
c  in DIMACS:
-7820 -7821 -7822  0

c i = 90
c  -2+1 --> -1
c    ( b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧  p_360) -> ( b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0)
c  in CNF:
c    -b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨  b^{4, 91}_2
c    -b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_1
c    -b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨  b^{4, 91}_0
c  in DIMACS:
-7823 -7824  7825 -360  7826 0
-7823 -7824  7825 -360 -7827 0
-7823 -7824  7825 -360  7828 0

c  -1+1 --> 0
c    ( b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0 ∧  p_360) -> (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧ -b^{4, 91}_0)
c  in CNF:
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_2
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_1
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_0
c  in DIMACS:
-7823  7824 -7825 -360 -7826 0
-7823  7824 -7825 -360 -7827 0
-7823  7824 -7825 -360 -7828 0

c  0+1 --> 1
c    (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧  p_360) -> (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0)
c  in CNF:
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_2
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_1
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨  b^{4, 91}_0
c  in DIMACS:
 7823  7824  7825 -360 -7826 0
 7823  7824  7825 -360 -7827 0
 7823  7824  7825 -360  7828 0

c  1+1 --> 2
c    (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0 ∧  p_360) -> (-b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0)
c  in CNF:
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_2
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨  b^{4, 91}_1
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ -p_360 ∨ -b^{4, 91}_0
c  in DIMACS:
 7823  7824 -7825 -360 -7826 0
 7823  7824 -7825 -360  7827 0
 7823  7824 -7825 -360 -7828 0

c  2+1 --> break 
c    (-b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧  p_360) -> break
c  in CNF:
c     b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 7823 -7824  7825 -360 1162 0


c  2-1 --> 1
c    (-b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧ -p_360) -> (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0)
c  in CNF:
c     b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_2
c     b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_1
c     b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨  b^{4, 91}_0
c  in DIMACS:
 7823 -7824  7825  360 -7826 0
 7823 -7824  7825  360 -7827 0
 7823 -7824  7825  360  7828 0

c  1-1 --> 0
c    (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0 ∧ -p_360) -> (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧ -b^{4, 91}_0)
c  in CNF:
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_2
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_1
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_0
c  in DIMACS:
 7823  7824 -7825  360 -7826 0
 7823  7824 -7825  360 -7827 0
 7823  7824 -7825  360 -7828 0

c  0-1 --> -1
c    (-b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧ -p_360) -> ( b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0)
c  in CNF:
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨  b^{4, 91}_2
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_1
c     b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨  b^{4, 91}_0
c  in DIMACS:
 7823  7824  7825  360  7826 0
 7823  7824  7825  360 -7827 0
 7823  7824  7825  360  7828 0

c  -1-1 --> -2
c    ( b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧  b^{4, 90}_0 ∧ -p_360) -> ( b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0)
c  in CNF:
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨  b^{4, 91}_2
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨  b^{4, 91}_1
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨  p_360 ∨ -b^{4, 91}_0
c  in DIMACS:
-7823  7824 -7825  360  7826 0
-7823  7824 -7825  360  7827 0
-7823  7824 -7825  360 -7828 0

c  -2-1 --> break 
c    ( b^{4, 90}_2 ∧  b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨  b^{4, 90}_0 ∨  p_360 ∨ break
c  in DIMACS:
-7823 -7824  7825  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 90}_2 ∧ -b^{4, 90}_1 ∧ -b^{4, 90}_0 ∧ true) 
c  in CNF:
c    -b^{4, 90}_2 ∨  b^{4, 90}_1 ∨  b^{4, 90}_0 ∨ false 
c  in DIMACS:
-7823  7824  7825  0

c  3 does not represent an automaton state.
c    -(-b^{4, 90}_2 ∧  b^{4, 90}_1 ∧  b^{4, 90}_0 ∧ true) 
c  in CNF:
c     b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ false 
c  in DIMACS:
 7823 -7824 -7825  0
c  -3 does not represent an automaton state.
c    -( b^{4, 90}_2 ∧  b^{4, 90}_1 ∧  b^{4, 90}_0 ∧ true) 
c  in CNF:
c    -b^{4, 90}_2 ∨ -b^{4, 90}_1 ∨ -b^{4, 90}_0 ∨ false 
c  in DIMACS:
-7823 -7824 -7825  0

c i = 91
c  -2+1 --> -1
c    ( b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧  p_364) -> ( b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0)
c  in CNF:
c    -b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨  b^{4, 92}_2
c    -b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_1
c    -b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨  b^{4, 92}_0
c  in DIMACS:
-7826 -7827  7828 -364  7829 0
-7826 -7827  7828 -364 -7830 0
-7826 -7827  7828 -364  7831 0

c  -1+1 --> 0
c    ( b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0 ∧  p_364) -> (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧ -b^{4, 92}_0)
c  in CNF:
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_2
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_1
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_0
c  in DIMACS:
-7826  7827 -7828 -364 -7829 0
-7826  7827 -7828 -364 -7830 0
-7826  7827 -7828 -364 -7831 0

c  0+1 --> 1
c    (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧  p_364) -> (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0)
c  in CNF:
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_2
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_1
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨  b^{4, 92}_0
c  in DIMACS:
 7826  7827  7828 -364 -7829 0
 7826  7827  7828 -364 -7830 0
 7826  7827  7828 -364  7831 0

c  1+1 --> 2
c    (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0 ∧  p_364) -> (-b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0)
c  in CNF:
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_2
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨  b^{4, 92}_1
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ -p_364 ∨ -b^{4, 92}_0
c  in DIMACS:
 7826  7827 -7828 -364 -7829 0
 7826  7827 -7828 -364  7830 0
 7826  7827 -7828 -364 -7831 0

c  2+1 --> break 
c    (-b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧  p_364) -> break
c  in CNF:
c     b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 7826 -7827  7828 -364 1162 0


c  2-1 --> 1
c    (-b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧ -p_364) -> (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0)
c  in CNF:
c     b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_2
c     b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_1
c     b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨  b^{4, 92}_0
c  in DIMACS:
 7826 -7827  7828  364 -7829 0
 7826 -7827  7828  364 -7830 0
 7826 -7827  7828  364  7831 0

c  1-1 --> 0
c    (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0 ∧ -p_364) -> (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧ -b^{4, 92}_0)
c  in CNF:
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_2
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_1
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_0
c  in DIMACS:
 7826  7827 -7828  364 -7829 0
 7826  7827 -7828  364 -7830 0
 7826  7827 -7828  364 -7831 0

c  0-1 --> -1
c    (-b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧ -p_364) -> ( b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0)
c  in CNF:
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨  b^{4, 92}_2
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_1
c     b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨  b^{4, 92}_0
c  in DIMACS:
 7826  7827  7828  364  7829 0
 7826  7827  7828  364 -7830 0
 7826  7827  7828  364  7831 0

c  -1-1 --> -2
c    ( b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧  b^{4, 91}_0 ∧ -p_364) -> ( b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0)
c  in CNF:
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨  b^{4, 92}_2
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨  b^{4, 92}_1
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨  p_364 ∨ -b^{4, 92}_0
c  in DIMACS:
-7826  7827 -7828  364  7829 0
-7826  7827 -7828  364  7830 0
-7826  7827 -7828  364 -7831 0

c  -2-1 --> break 
c    ( b^{4, 91}_2 ∧  b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨  b^{4, 91}_0 ∨  p_364 ∨ break
c  in DIMACS:
-7826 -7827  7828  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 91}_2 ∧ -b^{4, 91}_1 ∧ -b^{4, 91}_0 ∧ true) 
c  in CNF:
c    -b^{4, 91}_2 ∨  b^{4, 91}_1 ∨  b^{4, 91}_0 ∨ false 
c  in DIMACS:
-7826  7827  7828  0

c  3 does not represent an automaton state.
c    -(-b^{4, 91}_2 ∧  b^{4, 91}_1 ∧  b^{4, 91}_0 ∧ true) 
c  in CNF:
c     b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ false 
c  in DIMACS:
 7826 -7827 -7828  0
c  -3 does not represent an automaton state.
c    -( b^{4, 91}_2 ∧  b^{4, 91}_1 ∧  b^{4, 91}_0 ∧ true) 
c  in CNF:
c    -b^{4, 91}_2 ∨ -b^{4, 91}_1 ∨ -b^{4, 91}_0 ∨ false 
c  in DIMACS:
-7826 -7827 -7828  0

c i = 92
c  -2+1 --> -1
c    ( b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧  p_368) -> ( b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0)
c  in CNF:
c    -b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨  b^{4, 93}_2
c    -b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_1
c    -b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨  b^{4, 93}_0
c  in DIMACS:
-7829 -7830  7831 -368  7832 0
-7829 -7830  7831 -368 -7833 0
-7829 -7830  7831 -368  7834 0

c  -1+1 --> 0
c    ( b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0 ∧  p_368) -> (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧ -b^{4, 93}_0)
c  in CNF:
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_2
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_1
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_0
c  in DIMACS:
-7829  7830 -7831 -368 -7832 0
-7829  7830 -7831 -368 -7833 0
-7829  7830 -7831 -368 -7834 0

c  0+1 --> 1
c    (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧  p_368) -> (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0)
c  in CNF:
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_2
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_1
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨  b^{4, 93}_0
c  in DIMACS:
 7829  7830  7831 -368 -7832 0
 7829  7830  7831 -368 -7833 0
 7829  7830  7831 -368  7834 0

c  1+1 --> 2
c    (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0 ∧  p_368) -> (-b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0)
c  in CNF:
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_2
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨  b^{4, 93}_1
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ -p_368 ∨ -b^{4, 93}_0
c  in DIMACS:
 7829  7830 -7831 -368 -7832 0
 7829  7830 -7831 -368  7833 0
 7829  7830 -7831 -368 -7834 0

c  2+1 --> break 
c    (-b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧  p_368) -> break
c  in CNF:
c     b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 7829 -7830  7831 -368 1162 0


c  2-1 --> 1
c    (-b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧ -p_368) -> (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0)
c  in CNF:
c     b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_2
c     b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_1
c     b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨  b^{4, 93}_0
c  in DIMACS:
 7829 -7830  7831  368 -7832 0
 7829 -7830  7831  368 -7833 0
 7829 -7830  7831  368  7834 0

c  1-1 --> 0
c    (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0 ∧ -p_368) -> (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧ -b^{4, 93}_0)
c  in CNF:
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_2
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_1
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_0
c  in DIMACS:
 7829  7830 -7831  368 -7832 0
 7829  7830 -7831  368 -7833 0
 7829  7830 -7831  368 -7834 0

c  0-1 --> -1
c    (-b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧ -p_368) -> ( b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0)
c  in CNF:
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨  b^{4, 93}_2
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_1
c     b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨  b^{4, 93}_0
c  in DIMACS:
 7829  7830  7831  368  7832 0
 7829  7830  7831  368 -7833 0
 7829  7830  7831  368  7834 0

c  -1-1 --> -2
c    ( b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧  b^{4, 92}_0 ∧ -p_368) -> ( b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0)
c  in CNF:
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨  b^{4, 93}_2
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨  b^{4, 93}_1
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨  p_368 ∨ -b^{4, 93}_0
c  in DIMACS:
-7829  7830 -7831  368  7832 0
-7829  7830 -7831  368  7833 0
-7829  7830 -7831  368 -7834 0

c  -2-1 --> break 
c    ( b^{4, 92}_2 ∧  b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨  b^{4, 92}_0 ∨  p_368 ∨ break
c  in DIMACS:
-7829 -7830  7831  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 92}_2 ∧ -b^{4, 92}_1 ∧ -b^{4, 92}_0 ∧ true) 
c  in CNF:
c    -b^{4, 92}_2 ∨  b^{4, 92}_1 ∨  b^{4, 92}_0 ∨ false 
c  in DIMACS:
-7829  7830  7831  0

c  3 does not represent an automaton state.
c    -(-b^{4, 92}_2 ∧  b^{4, 92}_1 ∧  b^{4, 92}_0 ∧ true) 
c  in CNF:
c     b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ false 
c  in DIMACS:
 7829 -7830 -7831  0
c  -3 does not represent an automaton state.
c    -( b^{4, 92}_2 ∧  b^{4, 92}_1 ∧  b^{4, 92}_0 ∧ true) 
c  in CNF:
c    -b^{4, 92}_2 ∨ -b^{4, 92}_1 ∨ -b^{4, 92}_0 ∨ false 
c  in DIMACS:
-7829 -7830 -7831  0

c i = 93
c  -2+1 --> -1
c    ( b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧  p_372) -> ( b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0)
c  in CNF:
c    -b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨  b^{4, 94}_2
c    -b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_1
c    -b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨  b^{4, 94}_0
c  in DIMACS:
-7832 -7833  7834 -372  7835 0
-7832 -7833  7834 -372 -7836 0
-7832 -7833  7834 -372  7837 0

c  -1+1 --> 0
c    ( b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0 ∧  p_372) -> (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧ -b^{4, 94}_0)
c  in CNF:
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_2
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_1
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_0
c  in DIMACS:
-7832  7833 -7834 -372 -7835 0
-7832  7833 -7834 -372 -7836 0
-7832  7833 -7834 -372 -7837 0

c  0+1 --> 1
c    (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧  p_372) -> (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0)
c  in CNF:
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_2
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_1
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨  b^{4, 94}_0
c  in DIMACS:
 7832  7833  7834 -372 -7835 0
 7832  7833  7834 -372 -7836 0
 7832  7833  7834 -372  7837 0

c  1+1 --> 2
c    (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0 ∧  p_372) -> (-b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0)
c  in CNF:
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_2
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨  b^{4, 94}_1
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ -p_372 ∨ -b^{4, 94}_0
c  in DIMACS:
 7832  7833 -7834 -372 -7835 0
 7832  7833 -7834 -372  7836 0
 7832  7833 -7834 -372 -7837 0

c  2+1 --> break 
c    (-b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧  p_372) -> break
c  in CNF:
c     b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 7832 -7833  7834 -372 1162 0


c  2-1 --> 1
c    (-b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧ -p_372) -> (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0)
c  in CNF:
c     b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_2
c     b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_1
c     b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨  b^{4, 94}_0
c  in DIMACS:
 7832 -7833  7834  372 -7835 0
 7832 -7833  7834  372 -7836 0
 7832 -7833  7834  372  7837 0

c  1-1 --> 0
c    (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0 ∧ -p_372) -> (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧ -b^{4, 94}_0)
c  in CNF:
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_2
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_1
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_0
c  in DIMACS:
 7832  7833 -7834  372 -7835 0
 7832  7833 -7834  372 -7836 0
 7832  7833 -7834  372 -7837 0

c  0-1 --> -1
c    (-b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧ -p_372) -> ( b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0)
c  in CNF:
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨  b^{4, 94}_2
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_1
c     b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨  b^{4, 94}_0
c  in DIMACS:
 7832  7833  7834  372  7835 0
 7832  7833  7834  372 -7836 0
 7832  7833  7834  372  7837 0

c  -1-1 --> -2
c    ( b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧  b^{4, 93}_0 ∧ -p_372) -> ( b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0)
c  in CNF:
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨  b^{4, 94}_2
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨  b^{4, 94}_1
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨  p_372 ∨ -b^{4, 94}_0
c  in DIMACS:
-7832  7833 -7834  372  7835 0
-7832  7833 -7834  372  7836 0
-7832  7833 -7834  372 -7837 0

c  -2-1 --> break 
c    ( b^{4, 93}_2 ∧  b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨  b^{4, 93}_0 ∨  p_372 ∨ break
c  in DIMACS:
-7832 -7833  7834  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 93}_2 ∧ -b^{4, 93}_1 ∧ -b^{4, 93}_0 ∧ true) 
c  in CNF:
c    -b^{4, 93}_2 ∨  b^{4, 93}_1 ∨  b^{4, 93}_0 ∨ false 
c  in DIMACS:
-7832  7833  7834  0

c  3 does not represent an automaton state.
c    -(-b^{4, 93}_2 ∧  b^{4, 93}_1 ∧  b^{4, 93}_0 ∧ true) 
c  in CNF:
c     b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ false 
c  in DIMACS:
 7832 -7833 -7834  0
c  -3 does not represent an automaton state.
c    -( b^{4, 93}_2 ∧  b^{4, 93}_1 ∧  b^{4, 93}_0 ∧ true) 
c  in CNF:
c    -b^{4, 93}_2 ∨ -b^{4, 93}_1 ∨ -b^{4, 93}_0 ∨ false 
c  in DIMACS:
-7832 -7833 -7834  0

c i = 94
c  -2+1 --> -1
c    ( b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧  p_376) -> ( b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0)
c  in CNF:
c    -b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨  b^{4, 95}_2
c    -b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_1
c    -b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨  b^{4, 95}_0
c  in DIMACS:
-7835 -7836  7837 -376  7838 0
-7835 -7836  7837 -376 -7839 0
-7835 -7836  7837 -376  7840 0

c  -1+1 --> 0
c    ( b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0 ∧  p_376) -> (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧ -b^{4, 95}_0)
c  in CNF:
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_2
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_1
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_0
c  in DIMACS:
-7835  7836 -7837 -376 -7838 0
-7835  7836 -7837 -376 -7839 0
-7835  7836 -7837 -376 -7840 0

c  0+1 --> 1
c    (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧  p_376) -> (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0)
c  in CNF:
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_2
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_1
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨  b^{4, 95}_0
c  in DIMACS:
 7835  7836  7837 -376 -7838 0
 7835  7836  7837 -376 -7839 0
 7835  7836  7837 -376  7840 0

c  1+1 --> 2
c    (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0 ∧  p_376) -> (-b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0)
c  in CNF:
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_2
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨  b^{4, 95}_1
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ -p_376 ∨ -b^{4, 95}_0
c  in DIMACS:
 7835  7836 -7837 -376 -7838 0
 7835  7836 -7837 -376  7839 0
 7835  7836 -7837 -376 -7840 0

c  2+1 --> break 
c    (-b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧  p_376) -> break
c  in CNF:
c     b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 7835 -7836  7837 -376 1162 0


c  2-1 --> 1
c    (-b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧ -p_376) -> (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0)
c  in CNF:
c     b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_2
c     b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_1
c     b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨  b^{4, 95}_0
c  in DIMACS:
 7835 -7836  7837  376 -7838 0
 7835 -7836  7837  376 -7839 0
 7835 -7836  7837  376  7840 0

c  1-1 --> 0
c    (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0 ∧ -p_376) -> (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧ -b^{4, 95}_0)
c  in CNF:
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_2
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_1
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_0
c  in DIMACS:
 7835  7836 -7837  376 -7838 0
 7835  7836 -7837  376 -7839 0
 7835  7836 -7837  376 -7840 0

c  0-1 --> -1
c    (-b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧ -p_376) -> ( b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0)
c  in CNF:
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨  b^{4, 95}_2
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_1
c     b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨  b^{4, 95}_0
c  in DIMACS:
 7835  7836  7837  376  7838 0
 7835  7836  7837  376 -7839 0
 7835  7836  7837  376  7840 0

c  -1-1 --> -2
c    ( b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧  b^{4, 94}_0 ∧ -p_376) -> ( b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0)
c  in CNF:
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨  b^{4, 95}_2
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨  b^{4, 95}_1
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨  p_376 ∨ -b^{4, 95}_0
c  in DIMACS:
-7835  7836 -7837  376  7838 0
-7835  7836 -7837  376  7839 0
-7835  7836 -7837  376 -7840 0

c  -2-1 --> break 
c    ( b^{4, 94}_2 ∧  b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨  b^{4, 94}_0 ∨  p_376 ∨ break
c  in DIMACS:
-7835 -7836  7837  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 94}_2 ∧ -b^{4, 94}_1 ∧ -b^{4, 94}_0 ∧ true) 
c  in CNF:
c    -b^{4, 94}_2 ∨  b^{4, 94}_1 ∨  b^{4, 94}_0 ∨ false 
c  in DIMACS:
-7835  7836  7837  0

c  3 does not represent an automaton state.
c    -(-b^{4, 94}_2 ∧  b^{4, 94}_1 ∧  b^{4, 94}_0 ∧ true) 
c  in CNF:
c     b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ false 
c  in DIMACS:
 7835 -7836 -7837  0
c  -3 does not represent an automaton state.
c    -( b^{4, 94}_2 ∧  b^{4, 94}_1 ∧  b^{4, 94}_0 ∧ true) 
c  in CNF:
c    -b^{4, 94}_2 ∨ -b^{4, 94}_1 ∨ -b^{4, 94}_0 ∨ false 
c  in DIMACS:
-7835 -7836 -7837  0

c i = 95
c  -2+1 --> -1
c    ( b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧  p_380) -> ( b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0)
c  in CNF:
c    -b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨  b^{4, 96}_2
c    -b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_1
c    -b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨  b^{4, 96}_0
c  in DIMACS:
-7838 -7839  7840 -380  7841 0
-7838 -7839  7840 -380 -7842 0
-7838 -7839  7840 -380  7843 0

c  -1+1 --> 0
c    ( b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0 ∧  p_380) -> (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧ -b^{4, 96}_0)
c  in CNF:
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_2
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_1
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_0
c  in DIMACS:
-7838  7839 -7840 -380 -7841 0
-7838  7839 -7840 -380 -7842 0
-7838  7839 -7840 -380 -7843 0

c  0+1 --> 1
c    (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧  p_380) -> (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0)
c  in CNF:
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_2
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_1
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨  b^{4, 96}_0
c  in DIMACS:
 7838  7839  7840 -380 -7841 0
 7838  7839  7840 -380 -7842 0
 7838  7839  7840 -380  7843 0

c  1+1 --> 2
c    (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0 ∧  p_380) -> (-b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0)
c  in CNF:
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_2
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨  b^{4, 96}_1
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ -p_380 ∨ -b^{4, 96}_0
c  in DIMACS:
 7838  7839 -7840 -380 -7841 0
 7838  7839 -7840 -380  7842 0
 7838  7839 -7840 -380 -7843 0

c  2+1 --> break 
c    (-b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧  p_380) -> break
c  in CNF:
c     b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 7838 -7839  7840 -380 1162 0


c  2-1 --> 1
c    (-b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧ -p_380) -> (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0)
c  in CNF:
c     b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_2
c     b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_1
c     b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨  b^{4, 96}_0
c  in DIMACS:
 7838 -7839  7840  380 -7841 0
 7838 -7839  7840  380 -7842 0
 7838 -7839  7840  380  7843 0

c  1-1 --> 0
c    (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0 ∧ -p_380) -> (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧ -b^{4, 96}_0)
c  in CNF:
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_2
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_1
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_0
c  in DIMACS:
 7838  7839 -7840  380 -7841 0
 7838  7839 -7840  380 -7842 0
 7838  7839 -7840  380 -7843 0

c  0-1 --> -1
c    (-b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧ -p_380) -> ( b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0)
c  in CNF:
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨  b^{4, 96}_2
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_1
c     b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨  b^{4, 96}_0
c  in DIMACS:
 7838  7839  7840  380  7841 0
 7838  7839  7840  380 -7842 0
 7838  7839  7840  380  7843 0

c  -1-1 --> -2
c    ( b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧  b^{4, 95}_0 ∧ -p_380) -> ( b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0)
c  in CNF:
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨  b^{4, 96}_2
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨  b^{4, 96}_1
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨  p_380 ∨ -b^{4, 96}_0
c  in DIMACS:
-7838  7839 -7840  380  7841 0
-7838  7839 -7840  380  7842 0
-7838  7839 -7840  380 -7843 0

c  -2-1 --> break 
c    ( b^{4, 95}_2 ∧  b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨  b^{4, 95}_0 ∨  p_380 ∨ break
c  in DIMACS:
-7838 -7839  7840  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 95}_2 ∧ -b^{4, 95}_1 ∧ -b^{4, 95}_0 ∧ true) 
c  in CNF:
c    -b^{4, 95}_2 ∨  b^{4, 95}_1 ∨  b^{4, 95}_0 ∨ false 
c  in DIMACS:
-7838  7839  7840  0

c  3 does not represent an automaton state.
c    -(-b^{4, 95}_2 ∧  b^{4, 95}_1 ∧  b^{4, 95}_0 ∧ true) 
c  in CNF:
c     b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ false 
c  in DIMACS:
 7838 -7839 -7840  0
c  -3 does not represent an automaton state.
c    -( b^{4, 95}_2 ∧  b^{4, 95}_1 ∧  b^{4, 95}_0 ∧ true) 
c  in CNF:
c    -b^{4, 95}_2 ∨ -b^{4, 95}_1 ∨ -b^{4, 95}_0 ∨ false 
c  in DIMACS:
-7838 -7839 -7840  0

c i = 96
c  -2+1 --> -1
c    ( b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧  p_384) -> ( b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0)
c  in CNF:
c    -b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨  b^{4, 97}_2
c    -b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_1
c    -b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨  b^{4, 97}_0
c  in DIMACS:
-7841 -7842  7843 -384  7844 0
-7841 -7842  7843 -384 -7845 0
-7841 -7842  7843 -384  7846 0

c  -1+1 --> 0
c    ( b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0 ∧  p_384) -> (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧ -b^{4, 97}_0)
c  in CNF:
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_2
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_1
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_0
c  in DIMACS:
-7841  7842 -7843 -384 -7844 0
-7841  7842 -7843 -384 -7845 0
-7841  7842 -7843 -384 -7846 0

c  0+1 --> 1
c    (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧  p_384) -> (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0)
c  in CNF:
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_2
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_1
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨  b^{4, 97}_0
c  in DIMACS:
 7841  7842  7843 -384 -7844 0
 7841  7842  7843 -384 -7845 0
 7841  7842  7843 -384  7846 0

c  1+1 --> 2
c    (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0 ∧  p_384) -> (-b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0)
c  in CNF:
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_2
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨  b^{4, 97}_1
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ -p_384 ∨ -b^{4, 97}_0
c  in DIMACS:
 7841  7842 -7843 -384 -7844 0
 7841  7842 -7843 -384  7845 0
 7841  7842 -7843 -384 -7846 0

c  2+1 --> break 
c    (-b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧  p_384) -> break
c  in CNF:
c     b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 7841 -7842  7843 -384 1162 0


c  2-1 --> 1
c    (-b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧ -p_384) -> (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0)
c  in CNF:
c     b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_2
c     b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_1
c     b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨  b^{4, 97}_0
c  in DIMACS:
 7841 -7842  7843  384 -7844 0
 7841 -7842  7843  384 -7845 0
 7841 -7842  7843  384  7846 0

c  1-1 --> 0
c    (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0 ∧ -p_384) -> (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧ -b^{4, 97}_0)
c  in CNF:
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_2
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_1
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_0
c  in DIMACS:
 7841  7842 -7843  384 -7844 0
 7841  7842 -7843  384 -7845 0
 7841  7842 -7843  384 -7846 0

c  0-1 --> -1
c    (-b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧ -p_384) -> ( b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0)
c  in CNF:
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨  b^{4, 97}_2
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_1
c     b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨  b^{4, 97}_0
c  in DIMACS:
 7841  7842  7843  384  7844 0
 7841  7842  7843  384 -7845 0
 7841  7842  7843  384  7846 0

c  -1-1 --> -2
c    ( b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧  b^{4, 96}_0 ∧ -p_384) -> ( b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0)
c  in CNF:
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨  b^{4, 97}_2
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨  b^{4, 97}_1
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨  p_384 ∨ -b^{4, 97}_0
c  in DIMACS:
-7841  7842 -7843  384  7844 0
-7841  7842 -7843  384  7845 0
-7841  7842 -7843  384 -7846 0

c  -2-1 --> break 
c    ( b^{4, 96}_2 ∧  b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨  b^{4, 96}_0 ∨  p_384 ∨ break
c  in DIMACS:
-7841 -7842  7843  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 96}_2 ∧ -b^{4, 96}_1 ∧ -b^{4, 96}_0 ∧ true) 
c  in CNF:
c    -b^{4, 96}_2 ∨  b^{4, 96}_1 ∨  b^{4, 96}_0 ∨ false 
c  in DIMACS:
-7841  7842  7843  0

c  3 does not represent an automaton state.
c    -(-b^{4, 96}_2 ∧  b^{4, 96}_1 ∧  b^{4, 96}_0 ∧ true) 
c  in CNF:
c     b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ false 
c  in DIMACS:
 7841 -7842 -7843  0
c  -3 does not represent an automaton state.
c    -( b^{4, 96}_2 ∧  b^{4, 96}_1 ∧  b^{4, 96}_0 ∧ true) 
c  in CNF:
c    -b^{4, 96}_2 ∨ -b^{4, 96}_1 ∨ -b^{4, 96}_0 ∨ false 
c  in DIMACS:
-7841 -7842 -7843  0

c i = 97
c  -2+1 --> -1
c    ( b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧  p_388) -> ( b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0)
c  in CNF:
c    -b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨  b^{4, 98}_2
c    -b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_1
c    -b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨  b^{4, 98}_0
c  in DIMACS:
-7844 -7845  7846 -388  7847 0
-7844 -7845  7846 -388 -7848 0
-7844 -7845  7846 -388  7849 0

c  -1+1 --> 0
c    ( b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0 ∧  p_388) -> (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧ -b^{4, 98}_0)
c  in CNF:
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_2
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_1
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_0
c  in DIMACS:
-7844  7845 -7846 -388 -7847 0
-7844  7845 -7846 -388 -7848 0
-7844  7845 -7846 -388 -7849 0

c  0+1 --> 1
c    (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧  p_388) -> (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0)
c  in CNF:
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_2
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_1
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨  b^{4, 98}_0
c  in DIMACS:
 7844  7845  7846 -388 -7847 0
 7844  7845  7846 -388 -7848 0
 7844  7845  7846 -388  7849 0

c  1+1 --> 2
c    (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0 ∧  p_388) -> (-b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0)
c  in CNF:
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_2
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨  b^{4, 98}_1
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ -p_388 ∨ -b^{4, 98}_0
c  in DIMACS:
 7844  7845 -7846 -388 -7847 0
 7844  7845 -7846 -388  7848 0
 7844  7845 -7846 -388 -7849 0

c  2+1 --> break 
c    (-b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧  p_388) -> break
c  in CNF:
c     b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ -p_388 ∨ break
c  in DIMACS:
 7844 -7845  7846 -388 1162 0


c  2-1 --> 1
c    (-b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧ -p_388) -> (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0)
c  in CNF:
c     b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_2
c     b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_1
c     b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨  b^{4, 98}_0
c  in DIMACS:
 7844 -7845  7846  388 -7847 0
 7844 -7845  7846  388 -7848 0
 7844 -7845  7846  388  7849 0

c  1-1 --> 0
c    (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0 ∧ -p_388) -> (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧ -b^{4, 98}_0)
c  in CNF:
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_2
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_1
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_0
c  in DIMACS:
 7844  7845 -7846  388 -7847 0
 7844  7845 -7846  388 -7848 0
 7844  7845 -7846  388 -7849 0

c  0-1 --> -1
c    (-b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧ -p_388) -> ( b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0)
c  in CNF:
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨  b^{4, 98}_2
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_1
c     b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨  b^{4, 98}_0
c  in DIMACS:
 7844  7845  7846  388  7847 0
 7844  7845  7846  388 -7848 0
 7844  7845  7846  388  7849 0

c  -1-1 --> -2
c    ( b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧  b^{4, 97}_0 ∧ -p_388) -> ( b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0)
c  in CNF:
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨  b^{4, 98}_2
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨  b^{4, 98}_1
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨  p_388 ∨ -b^{4, 98}_0
c  in DIMACS:
-7844  7845 -7846  388  7847 0
-7844  7845 -7846  388  7848 0
-7844  7845 -7846  388 -7849 0

c  -2-1 --> break 
c    ( b^{4, 97}_2 ∧  b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧ -p_388) -> break
c  in CNF:
c    -b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨  b^{4, 97}_0 ∨  p_388 ∨ break
c  in DIMACS:
-7844 -7845  7846  388 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 97}_2 ∧ -b^{4, 97}_1 ∧ -b^{4, 97}_0 ∧ true) 
c  in CNF:
c    -b^{4, 97}_2 ∨  b^{4, 97}_1 ∨  b^{4, 97}_0 ∨ false 
c  in DIMACS:
-7844  7845  7846  0

c  3 does not represent an automaton state.
c    -(-b^{4, 97}_2 ∧  b^{4, 97}_1 ∧  b^{4, 97}_0 ∧ true) 
c  in CNF:
c     b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ false 
c  in DIMACS:
 7844 -7845 -7846  0
c  -3 does not represent an automaton state.
c    -( b^{4, 97}_2 ∧  b^{4, 97}_1 ∧  b^{4, 97}_0 ∧ true) 
c  in CNF:
c    -b^{4, 97}_2 ∨ -b^{4, 97}_1 ∨ -b^{4, 97}_0 ∨ false 
c  in DIMACS:
-7844 -7845 -7846  0

c i = 98
c  -2+1 --> -1
c    ( b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧  p_392) -> ( b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0)
c  in CNF:
c    -b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨  b^{4, 99}_2
c    -b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_1
c    -b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨  b^{4, 99}_0
c  in DIMACS:
-7847 -7848  7849 -392  7850 0
-7847 -7848  7849 -392 -7851 0
-7847 -7848  7849 -392  7852 0

c  -1+1 --> 0
c    ( b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0 ∧  p_392) -> (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧ -b^{4, 99}_0)
c  in CNF:
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_2
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_1
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_0
c  in DIMACS:
-7847  7848 -7849 -392 -7850 0
-7847  7848 -7849 -392 -7851 0
-7847  7848 -7849 -392 -7852 0

c  0+1 --> 1
c    (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧  p_392) -> (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0)
c  in CNF:
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_2
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_1
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨  b^{4, 99}_0
c  in DIMACS:
 7847  7848  7849 -392 -7850 0
 7847  7848  7849 -392 -7851 0
 7847  7848  7849 -392  7852 0

c  1+1 --> 2
c    (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0 ∧  p_392) -> (-b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0)
c  in CNF:
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_2
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨  b^{4, 99}_1
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ -p_392 ∨ -b^{4, 99}_0
c  in DIMACS:
 7847  7848 -7849 -392 -7850 0
 7847  7848 -7849 -392  7851 0
 7847  7848 -7849 -392 -7852 0

c  2+1 --> break 
c    (-b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧  p_392) -> break
c  in CNF:
c     b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 7847 -7848  7849 -392 1162 0


c  2-1 --> 1
c    (-b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧ -p_392) -> (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0)
c  in CNF:
c     b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_2
c     b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_1
c     b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨  b^{4, 99}_0
c  in DIMACS:
 7847 -7848  7849  392 -7850 0
 7847 -7848  7849  392 -7851 0
 7847 -7848  7849  392  7852 0

c  1-1 --> 0
c    (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0 ∧ -p_392) -> (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧ -b^{4, 99}_0)
c  in CNF:
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_2
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_1
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_0
c  in DIMACS:
 7847  7848 -7849  392 -7850 0
 7847  7848 -7849  392 -7851 0
 7847  7848 -7849  392 -7852 0

c  0-1 --> -1
c    (-b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧ -p_392) -> ( b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0)
c  in CNF:
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨  b^{4, 99}_2
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_1
c     b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨  b^{4, 99}_0
c  in DIMACS:
 7847  7848  7849  392  7850 0
 7847  7848  7849  392 -7851 0
 7847  7848  7849  392  7852 0

c  -1-1 --> -2
c    ( b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧  b^{4, 98}_0 ∧ -p_392) -> ( b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0)
c  in CNF:
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨  b^{4, 99}_2
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨  b^{4, 99}_1
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨  p_392 ∨ -b^{4, 99}_0
c  in DIMACS:
-7847  7848 -7849  392  7850 0
-7847  7848 -7849  392  7851 0
-7847  7848 -7849  392 -7852 0

c  -2-1 --> break 
c    ( b^{4, 98}_2 ∧  b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨  b^{4, 98}_0 ∨  p_392 ∨ break
c  in DIMACS:
-7847 -7848  7849  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 98}_2 ∧ -b^{4, 98}_1 ∧ -b^{4, 98}_0 ∧ true) 
c  in CNF:
c    -b^{4, 98}_2 ∨  b^{4, 98}_1 ∨  b^{4, 98}_0 ∨ false 
c  in DIMACS:
-7847  7848  7849  0

c  3 does not represent an automaton state.
c    -(-b^{4, 98}_2 ∧  b^{4, 98}_1 ∧  b^{4, 98}_0 ∧ true) 
c  in CNF:
c     b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ false 
c  in DIMACS:
 7847 -7848 -7849  0
c  -3 does not represent an automaton state.
c    -( b^{4, 98}_2 ∧  b^{4, 98}_1 ∧  b^{4, 98}_0 ∧ true) 
c  in CNF:
c    -b^{4, 98}_2 ∨ -b^{4, 98}_1 ∨ -b^{4, 98}_0 ∨ false 
c  in DIMACS:
-7847 -7848 -7849  0

c i = 99
c  -2+1 --> -1
c    ( b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧  p_396) -> ( b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0)
c  in CNF:
c    -b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨  b^{4, 100}_2
c    -b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_1
c    -b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨  b^{4, 100}_0
c  in DIMACS:
-7850 -7851  7852 -396  7853 0
-7850 -7851  7852 -396 -7854 0
-7850 -7851  7852 -396  7855 0

c  -1+1 --> 0
c    ( b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0 ∧  p_396) -> (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧ -b^{4, 100}_0)
c  in CNF:
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_2
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_1
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_0
c  in DIMACS:
-7850  7851 -7852 -396 -7853 0
-7850  7851 -7852 -396 -7854 0
-7850  7851 -7852 -396 -7855 0

c  0+1 --> 1
c    (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧  p_396) -> (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0)
c  in CNF:
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_2
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_1
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨  b^{4, 100}_0
c  in DIMACS:
 7850  7851  7852 -396 -7853 0
 7850  7851  7852 -396 -7854 0
 7850  7851  7852 -396  7855 0

c  1+1 --> 2
c    (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0 ∧  p_396) -> (-b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0)
c  in CNF:
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_2
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨  b^{4, 100}_1
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ -p_396 ∨ -b^{4, 100}_0
c  in DIMACS:
 7850  7851 -7852 -396 -7853 0
 7850  7851 -7852 -396  7854 0
 7850  7851 -7852 -396 -7855 0

c  2+1 --> break 
c    (-b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧  p_396) -> break
c  in CNF:
c     b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 7850 -7851  7852 -396 1162 0


c  2-1 --> 1
c    (-b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧ -p_396) -> (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0)
c  in CNF:
c     b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_2
c     b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_1
c     b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨  b^{4, 100}_0
c  in DIMACS:
 7850 -7851  7852  396 -7853 0
 7850 -7851  7852  396 -7854 0
 7850 -7851  7852  396  7855 0

c  1-1 --> 0
c    (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0 ∧ -p_396) -> (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧ -b^{4, 100}_0)
c  in CNF:
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_2
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_1
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_0
c  in DIMACS:
 7850  7851 -7852  396 -7853 0
 7850  7851 -7852  396 -7854 0
 7850  7851 -7852  396 -7855 0

c  0-1 --> -1
c    (-b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧ -p_396) -> ( b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0)
c  in CNF:
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨  b^{4, 100}_2
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_1
c     b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨  b^{4, 100}_0
c  in DIMACS:
 7850  7851  7852  396  7853 0
 7850  7851  7852  396 -7854 0
 7850  7851  7852  396  7855 0

c  -1-1 --> -2
c    ( b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧  b^{4, 99}_0 ∧ -p_396) -> ( b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0)
c  in CNF:
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨  b^{4, 100}_2
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨  b^{4, 100}_1
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨  p_396 ∨ -b^{4, 100}_0
c  in DIMACS:
-7850  7851 -7852  396  7853 0
-7850  7851 -7852  396  7854 0
-7850  7851 -7852  396 -7855 0

c  -2-1 --> break 
c    ( b^{4, 99}_2 ∧  b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨  b^{4, 99}_0 ∨  p_396 ∨ break
c  in DIMACS:
-7850 -7851  7852  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 99}_2 ∧ -b^{4, 99}_1 ∧ -b^{4, 99}_0 ∧ true) 
c  in CNF:
c    -b^{4, 99}_2 ∨  b^{4, 99}_1 ∨  b^{4, 99}_0 ∨ false 
c  in DIMACS:
-7850  7851  7852  0

c  3 does not represent an automaton state.
c    -(-b^{4, 99}_2 ∧  b^{4, 99}_1 ∧  b^{4, 99}_0 ∧ true) 
c  in CNF:
c     b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ false 
c  in DIMACS:
 7850 -7851 -7852  0
c  -3 does not represent an automaton state.
c    -( b^{4, 99}_2 ∧  b^{4, 99}_1 ∧  b^{4, 99}_0 ∧ true) 
c  in CNF:
c    -b^{4, 99}_2 ∨ -b^{4, 99}_1 ∨ -b^{4, 99}_0 ∨ false 
c  in DIMACS:
-7850 -7851 -7852  0

c i = 100
c  -2+1 --> -1
c    ( b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧  p_400) -> ( b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0)
c  in CNF:
c    -b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨  b^{4, 101}_2
c    -b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_1
c    -b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨  b^{4, 101}_0
c  in DIMACS:
-7853 -7854  7855 -400  7856 0
-7853 -7854  7855 -400 -7857 0
-7853 -7854  7855 -400  7858 0

c  -1+1 --> 0
c    ( b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0 ∧  p_400) -> (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧ -b^{4, 101}_0)
c  in CNF:
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_2
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_1
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_0
c  in DIMACS:
-7853  7854 -7855 -400 -7856 0
-7853  7854 -7855 -400 -7857 0
-7853  7854 -7855 -400 -7858 0

c  0+1 --> 1
c    (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧  p_400) -> (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0)
c  in CNF:
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_2
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_1
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨  b^{4, 101}_0
c  in DIMACS:
 7853  7854  7855 -400 -7856 0
 7853  7854  7855 -400 -7857 0
 7853  7854  7855 -400  7858 0

c  1+1 --> 2
c    (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0 ∧  p_400) -> (-b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0)
c  in CNF:
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_2
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨  b^{4, 101}_1
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ -p_400 ∨ -b^{4, 101}_0
c  in DIMACS:
 7853  7854 -7855 -400 -7856 0
 7853  7854 -7855 -400  7857 0
 7853  7854 -7855 -400 -7858 0

c  2+1 --> break 
c    (-b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧  p_400) -> break
c  in CNF:
c     b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 7853 -7854  7855 -400 1162 0


c  2-1 --> 1
c    (-b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧ -p_400) -> (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0)
c  in CNF:
c     b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_2
c     b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_1
c     b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨  b^{4, 101}_0
c  in DIMACS:
 7853 -7854  7855  400 -7856 0
 7853 -7854  7855  400 -7857 0
 7853 -7854  7855  400  7858 0

c  1-1 --> 0
c    (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0 ∧ -p_400) -> (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧ -b^{4, 101}_0)
c  in CNF:
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_2
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_1
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_0
c  in DIMACS:
 7853  7854 -7855  400 -7856 0
 7853  7854 -7855  400 -7857 0
 7853  7854 -7855  400 -7858 0

c  0-1 --> -1
c    (-b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧ -p_400) -> ( b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0)
c  in CNF:
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨  b^{4, 101}_2
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_1
c     b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨  b^{4, 101}_0
c  in DIMACS:
 7853  7854  7855  400  7856 0
 7853  7854  7855  400 -7857 0
 7853  7854  7855  400  7858 0

c  -1-1 --> -2
c    ( b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧  b^{4, 100}_0 ∧ -p_400) -> ( b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0)
c  in CNF:
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨  b^{4, 101}_2
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨  b^{4, 101}_1
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨  p_400 ∨ -b^{4, 101}_0
c  in DIMACS:
-7853  7854 -7855  400  7856 0
-7853  7854 -7855  400  7857 0
-7853  7854 -7855  400 -7858 0

c  -2-1 --> break 
c    ( b^{4, 100}_2 ∧  b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨  b^{4, 100}_0 ∨  p_400 ∨ break
c  in DIMACS:
-7853 -7854  7855  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 100}_2 ∧ -b^{4, 100}_1 ∧ -b^{4, 100}_0 ∧ true) 
c  in CNF:
c    -b^{4, 100}_2 ∨  b^{4, 100}_1 ∨  b^{4, 100}_0 ∨ false 
c  in DIMACS:
-7853  7854  7855  0

c  3 does not represent an automaton state.
c    -(-b^{4, 100}_2 ∧  b^{4, 100}_1 ∧  b^{4, 100}_0 ∧ true) 
c  in CNF:
c     b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ false 
c  in DIMACS:
 7853 -7854 -7855  0
c  -3 does not represent an automaton state.
c    -( b^{4, 100}_2 ∧  b^{4, 100}_1 ∧  b^{4, 100}_0 ∧ true) 
c  in CNF:
c    -b^{4, 100}_2 ∨ -b^{4, 100}_1 ∨ -b^{4, 100}_0 ∨ false 
c  in DIMACS:
-7853 -7854 -7855  0

c i = 101
c  -2+1 --> -1
c    ( b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧  p_404) -> ( b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0)
c  in CNF:
c    -b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨  b^{4, 102}_2
c    -b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_1
c    -b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨  b^{4, 102}_0
c  in DIMACS:
-7856 -7857  7858 -404  7859 0
-7856 -7857  7858 -404 -7860 0
-7856 -7857  7858 -404  7861 0

c  -1+1 --> 0
c    ( b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0 ∧  p_404) -> (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧ -b^{4, 102}_0)
c  in CNF:
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_2
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_1
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_0
c  in DIMACS:
-7856  7857 -7858 -404 -7859 0
-7856  7857 -7858 -404 -7860 0
-7856  7857 -7858 -404 -7861 0

c  0+1 --> 1
c    (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧  p_404) -> (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0)
c  in CNF:
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_2
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_1
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨  b^{4, 102}_0
c  in DIMACS:
 7856  7857  7858 -404 -7859 0
 7856  7857  7858 -404 -7860 0
 7856  7857  7858 -404  7861 0

c  1+1 --> 2
c    (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0 ∧  p_404) -> (-b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0)
c  in CNF:
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_2
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨  b^{4, 102}_1
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ -p_404 ∨ -b^{4, 102}_0
c  in DIMACS:
 7856  7857 -7858 -404 -7859 0
 7856  7857 -7858 -404  7860 0
 7856  7857 -7858 -404 -7861 0

c  2+1 --> break 
c    (-b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧  p_404) -> break
c  in CNF:
c     b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ -p_404 ∨ break
c  in DIMACS:
 7856 -7857  7858 -404 1162 0


c  2-1 --> 1
c    (-b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧ -p_404) -> (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0)
c  in CNF:
c     b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_2
c     b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_1
c     b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨  b^{4, 102}_0
c  in DIMACS:
 7856 -7857  7858  404 -7859 0
 7856 -7857  7858  404 -7860 0
 7856 -7857  7858  404  7861 0

c  1-1 --> 0
c    (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0 ∧ -p_404) -> (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧ -b^{4, 102}_0)
c  in CNF:
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_2
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_1
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_0
c  in DIMACS:
 7856  7857 -7858  404 -7859 0
 7856  7857 -7858  404 -7860 0
 7856  7857 -7858  404 -7861 0

c  0-1 --> -1
c    (-b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧ -p_404) -> ( b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0)
c  in CNF:
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨  b^{4, 102}_2
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_1
c     b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨  b^{4, 102}_0
c  in DIMACS:
 7856  7857  7858  404  7859 0
 7856  7857  7858  404 -7860 0
 7856  7857  7858  404  7861 0

c  -1-1 --> -2
c    ( b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧  b^{4, 101}_0 ∧ -p_404) -> ( b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0)
c  in CNF:
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨  b^{4, 102}_2
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨  b^{4, 102}_1
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨  p_404 ∨ -b^{4, 102}_0
c  in DIMACS:
-7856  7857 -7858  404  7859 0
-7856  7857 -7858  404  7860 0
-7856  7857 -7858  404 -7861 0

c  -2-1 --> break 
c    ( b^{4, 101}_2 ∧  b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧ -p_404) -> break
c  in CNF:
c    -b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨  b^{4, 101}_0 ∨  p_404 ∨ break
c  in DIMACS:
-7856 -7857  7858  404 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 101}_2 ∧ -b^{4, 101}_1 ∧ -b^{4, 101}_0 ∧ true) 
c  in CNF:
c    -b^{4, 101}_2 ∨  b^{4, 101}_1 ∨  b^{4, 101}_0 ∨ false 
c  in DIMACS:
-7856  7857  7858  0

c  3 does not represent an automaton state.
c    -(-b^{4, 101}_2 ∧  b^{4, 101}_1 ∧  b^{4, 101}_0 ∧ true) 
c  in CNF:
c     b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ false 
c  in DIMACS:
 7856 -7857 -7858  0
c  -3 does not represent an automaton state.
c    -( b^{4, 101}_2 ∧  b^{4, 101}_1 ∧  b^{4, 101}_0 ∧ true) 
c  in CNF:
c    -b^{4, 101}_2 ∨ -b^{4, 101}_1 ∨ -b^{4, 101}_0 ∨ false 
c  in DIMACS:
-7856 -7857 -7858  0

c i = 102
c  -2+1 --> -1
c    ( b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧  p_408) -> ( b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0)
c  in CNF:
c    -b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨  b^{4, 103}_2
c    -b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_1
c    -b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨  b^{4, 103}_0
c  in DIMACS:
-7859 -7860  7861 -408  7862 0
-7859 -7860  7861 -408 -7863 0
-7859 -7860  7861 -408  7864 0

c  -1+1 --> 0
c    ( b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0 ∧  p_408) -> (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧ -b^{4, 103}_0)
c  in CNF:
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_2
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_1
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_0
c  in DIMACS:
-7859  7860 -7861 -408 -7862 0
-7859  7860 -7861 -408 -7863 0
-7859  7860 -7861 -408 -7864 0

c  0+1 --> 1
c    (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧  p_408) -> (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0)
c  in CNF:
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_2
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_1
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨  b^{4, 103}_0
c  in DIMACS:
 7859  7860  7861 -408 -7862 0
 7859  7860  7861 -408 -7863 0
 7859  7860  7861 -408  7864 0

c  1+1 --> 2
c    (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0 ∧  p_408) -> (-b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0)
c  in CNF:
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_2
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨  b^{4, 103}_1
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ -p_408 ∨ -b^{4, 103}_0
c  in DIMACS:
 7859  7860 -7861 -408 -7862 0
 7859  7860 -7861 -408  7863 0
 7859  7860 -7861 -408 -7864 0

c  2+1 --> break 
c    (-b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧  p_408) -> break
c  in CNF:
c     b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 7859 -7860  7861 -408 1162 0


c  2-1 --> 1
c    (-b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧ -p_408) -> (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0)
c  in CNF:
c     b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_2
c     b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_1
c     b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨  b^{4, 103}_0
c  in DIMACS:
 7859 -7860  7861  408 -7862 0
 7859 -7860  7861  408 -7863 0
 7859 -7860  7861  408  7864 0

c  1-1 --> 0
c    (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0 ∧ -p_408) -> (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧ -b^{4, 103}_0)
c  in CNF:
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_2
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_1
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_0
c  in DIMACS:
 7859  7860 -7861  408 -7862 0
 7859  7860 -7861  408 -7863 0
 7859  7860 -7861  408 -7864 0

c  0-1 --> -1
c    (-b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧ -p_408) -> ( b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0)
c  in CNF:
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨  b^{4, 103}_2
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_1
c     b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨  b^{4, 103}_0
c  in DIMACS:
 7859  7860  7861  408  7862 0
 7859  7860  7861  408 -7863 0
 7859  7860  7861  408  7864 0

c  -1-1 --> -2
c    ( b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧  b^{4, 102}_0 ∧ -p_408) -> ( b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0)
c  in CNF:
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨  b^{4, 103}_2
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨  b^{4, 103}_1
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨  p_408 ∨ -b^{4, 103}_0
c  in DIMACS:
-7859  7860 -7861  408  7862 0
-7859  7860 -7861  408  7863 0
-7859  7860 -7861  408 -7864 0

c  -2-1 --> break 
c    ( b^{4, 102}_2 ∧  b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨  b^{4, 102}_0 ∨  p_408 ∨ break
c  in DIMACS:
-7859 -7860  7861  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 102}_2 ∧ -b^{4, 102}_1 ∧ -b^{4, 102}_0 ∧ true) 
c  in CNF:
c    -b^{4, 102}_2 ∨  b^{4, 102}_1 ∨  b^{4, 102}_0 ∨ false 
c  in DIMACS:
-7859  7860  7861  0

c  3 does not represent an automaton state.
c    -(-b^{4, 102}_2 ∧  b^{4, 102}_1 ∧  b^{4, 102}_0 ∧ true) 
c  in CNF:
c     b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ false 
c  in DIMACS:
 7859 -7860 -7861  0
c  -3 does not represent an automaton state.
c    -( b^{4, 102}_2 ∧  b^{4, 102}_1 ∧  b^{4, 102}_0 ∧ true) 
c  in CNF:
c    -b^{4, 102}_2 ∨ -b^{4, 102}_1 ∨ -b^{4, 102}_0 ∨ false 
c  in DIMACS:
-7859 -7860 -7861  0

c i = 103
c  -2+1 --> -1
c    ( b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧  p_412) -> ( b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0)
c  in CNF:
c    -b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨  b^{4, 104}_2
c    -b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_1
c    -b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨  b^{4, 104}_0
c  in DIMACS:
-7862 -7863  7864 -412  7865 0
-7862 -7863  7864 -412 -7866 0
-7862 -7863  7864 -412  7867 0

c  -1+1 --> 0
c    ( b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0 ∧  p_412) -> (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧ -b^{4, 104}_0)
c  in CNF:
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_2
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_1
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_0
c  in DIMACS:
-7862  7863 -7864 -412 -7865 0
-7862  7863 -7864 -412 -7866 0
-7862  7863 -7864 -412 -7867 0

c  0+1 --> 1
c    (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧  p_412) -> (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0)
c  in CNF:
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_2
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_1
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨  b^{4, 104}_0
c  in DIMACS:
 7862  7863  7864 -412 -7865 0
 7862  7863  7864 -412 -7866 0
 7862  7863  7864 -412  7867 0

c  1+1 --> 2
c    (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0 ∧  p_412) -> (-b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0)
c  in CNF:
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_2
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨  b^{4, 104}_1
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ -p_412 ∨ -b^{4, 104}_0
c  in DIMACS:
 7862  7863 -7864 -412 -7865 0
 7862  7863 -7864 -412  7866 0
 7862  7863 -7864 -412 -7867 0

c  2+1 --> break 
c    (-b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧  p_412) -> break
c  in CNF:
c     b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ -p_412 ∨ break
c  in DIMACS:
 7862 -7863  7864 -412 1162 0


c  2-1 --> 1
c    (-b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧ -p_412) -> (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0)
c  in CNF:
c     b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_2
c     b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_1
c     b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨  b^{4, 104}_0
c  in DIMACS:
 7862 -7863  7864  412 -7865 0
 7862 -7863  7864  412 -7866 0
 7862 -7863  7864  412  7867 0

c  1-1 --> 0
c    (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0 ∧ -p_412) -> (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧ -b^{4, 104}_0)
c  in CNF:
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_2
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_1
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_0
c  in DIMACS:
 7862  7863 -7864  412 -7865 0
 7862  7863 -7864  412 -7866 0
 7862  7863 -7864  412 -7867 0

c  0-1 --> -1
c    (-b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧ -p_412) -> ( b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0)
c  in CNF:
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨  b^{4, 104}_2
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_1
c     b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨  b^{4, 104}_0
c  in DIMACS:
 7862  7863  7864  412  7865 0
 7862  7863  7864  412 -7866 0
 7862  7863  7864  412  7867 0

c  -1-1 --> -2
c    ( b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧  b^{4, 103}_0 ∧ -p_412) -> ( b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0)
c  in CNF:
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨  b^{4, 104}_2
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨  b^{4, 104}_1
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨  p_412 ∨ -b^{4, 104}_0
c  in DIMACS:
-7862  7863 -7864  412  7865 0
-7862  7863 -7864  412  7866 0
-7862  7863 -7864  412 -7867 0

c  -2-1 --> break 
c    ( b^{4, 103}_2 ∧  b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧ -p_412) -> break
c  in CNF:
c    -b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨  b^{4, 103}_0 ∨  p_412 ∨ break
c  in DIMACS:
-7862 -7863  7864  412 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 103}_2 ∧ -b^{4, 103}_1 ∧ -b^{4, 103}_0 ∧ true) 
c  in CNF:
c    -b^{4, 103}_2 ∨  b^{4, 103}_1 ∨  b^{4, 103}_0 ∨ false 
c  in DIMACS:
-7862  7863  7864  0

c  3 does not represent an automaton state.
c    -(-b^{4, 103}_2 ∧  b^{4, 103}_1 ∧  b^{4, 103}_0 ∧ true) 
c  in CNF:
c     b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ false 
c  in DIMACS:
 7862 -7863 -7864  0
c  -3 does not represent an automaton state.
c    -( b^{4, 103}_2 ∧  b^{4, 103}_1 ∧  b^{4, 103}_0 ∧ true) 
c  in CNF:
c    -b^{4, 103}_2 ∨ -b^{4, 103}_1 ∨ -b^{4, 103}_0 ∨ false 
c  in DIMACS:
-7862 -7863 -7864  0

c i = 104
c  -2+1 --> -1
c    ( b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧  p_416) -> ( b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0)
c  in CNF:
c    -b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨  b^{4, 105}_2
c    -b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_1
c    -b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨  b^{4, 105}_0
c  in DIMACS:
-7865 -7866  7867 -416  7868 0
-7865 -7866  7867 -416 -7869 0
-7865 -7866  7867 -416  7870 0

c  -1+1 --> 0
c    ( b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0 ∧  p_416) -> (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧ -b^{4, 105}_0)
c  in CNF:
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_2
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_1
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_0
c  in DIMACS:
-7865  7866 -7867 -416 -7868 0
-7865  7866 -7867 -416 -7869 0
-7865  7866 -7867 -416 -7870 0

c  0+1 --> 1
c    (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧  p_416) -> (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0)
c  in CNF:
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_2
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_1
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨  b^{4, 105}_0
c  in DIMACS:
 7865  7866  7867 -416 -7868 0
 7865  7866  7867 -416 -7869 0
 7865  7866  7867 -416  7870 0

c  1+1 --> 2
c    (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0 ∧  p_416) -> (-b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0)
c  in CNF:
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_2
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨  b^{4, 105}_1
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ -p_416 ∨ -b^{4, 105}_0
c  in DIMACS:
 7865  7866 -7867 -416 -7868 0
 7865  7866 -7867 -416  7869 0
 7865  7866 -7867 -416 -7870 0

c  2+1 --> break 
c    (-b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧  p_416) -> break
c  in CNF:
c     b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 7865 -7866  7867 -416 1162 0


c  2-1 --> 1
c    (-b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧ -p_416) -> (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0)
c  in CNF:
c     b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_2
c     b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_1
c     b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨  b^{4, 105}_0
c  in DIMACS:
 7865 -7866  7867  416 -7868 0
 7865 -7866  7867  416 -7869 0
 7865 -7866  7867  416  7870 0

c  1-1 --> 0
c    (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0 ∧ -p_416) -> (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧ -b^{4, 105}_0)
c  in CNF:
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_2
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_1
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_0
c  in DIMACS:
 7865  7866 -7867  416 -7868 0
 7865  7866 -7867  416 -7869 0
 7865  7866 -7867  416 -7870 0

c  0-1 --> -1
c    (-b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧ -p_416) -> ( b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0)
c  in CNF:
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨  b^{4, 105}_2
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_1
c     b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨  b^{4, 105}_0
c  in DIMACS:
 7865  7866  7867  416  7868 0
 7865  7866  7867  416 -7869 0
 7865  7866  7867  416  7870 0

c  -1-1 --> -2
c    ( b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧  b^{4, 104}_0 ∧ -p_416) -> ( b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0)
c  in CNF:
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨  b^{4, 105}_2
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨  b^{4, 105}_1
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨  p_416 ∨ -b^{4, 105}_0
c  in DIMACS:
-7865  7866 -7867  416  7868 0
-7865  7866 -7867  416  7869 0
-7865  7866 -7867  416 -7870 0

c  -2-1 --> break 
c    ( b^{4, 104}_2 ∧  b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨  b^{4, 104}_0 ∨  p_416 ∨ break
c  in DIMACS:
-7865 -7866  7867  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 104}_2 ∧ -b^{4, 104}_1 ∧ -b^{4, 104}_0 ∧ true) 
c  in CNF:
c    -b^{4, 104}_2 ∨  b^{4, 104}_1 ∨  b^{4, 104}_0 ∨ false 
c  in DIMACS:
-7865  7866  7867  0

c  3 does not represent an automaton state.
c    -(-b^{4, 104}_2 ∧  b^{4, 104}_1 ∧  b^{4, 104}_0 ∧ true) 
c  in CNF:
c     b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ false 
c  in DIMACS:
 7865 -7866 -7867  0
c  -3 does not represent an automaton state.
c    -( b^{4, 104}_2 ∧  b^{4, 104}_1 ∧  b^{4, 104}_0 ∧ true) 
c  in CNF:
c    -b^{4, 104}_2 ∨ -b^{4, 104}_1 ∨ -b^{4, 104}_0 ∨ false 
c  in DIMACS:
-7865 -7866 -7867  0

c i = 105
c  -2+1 --> -1
c    ( b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧  p_420) -> ( b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0)
c  in CNF:
c    -b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨  b^{4, 106}_2
c    -b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_1
c    -b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨  b^{4, 106}_0
c  in DIMACS:
-7868 -7869  7870 -420  7871 0
-7868 -7869  7870 -420 -7872 0
-7868 -7869  7870 -420  7873 0

c  -1+1 --> 0
c    ( b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0 ∧  p_420) -> (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧ -b^{4, 106}_0)
c  in CNF:
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_2
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_1
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_0
c  in DIMACS:
-7868  7869 -7870 -420 -7871 0
-7868  7869 -7870 -420 -7872 0
-7868  7869 -7870 -420 -7873 0

c  0+1 --> 1
c    (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧  p_420) -> (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0)
c  in CNF:
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_2
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_1
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨  b^{4, 106}_0
c  in DIMACS:
 7868  7869  7870 -420 -7871 0
 7868  7869  7870 -420 -7872 0
 7868  7869  7870 -420  7873 0

c  1+1 --> 2
c    (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0 ∧  p_420) -> (-b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0)
c  in CNF:
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_2
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨  b^{4, 106}_1
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ -p_420 ∨ -b^{4, 106}_0
c  in DIMACS:
 7868  7869 -7870 -420 -7871 0
 7868  7869 -7870 -420  7872 0
 7868  7869 -7870 -420 -7873 0

c  2+1 --> break 
c    (-b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧  p_420) -> break
c  in CNF:
c     b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 7868 -7869  7870 -420 1162 0


c  2-1 --> 1
c    (-b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧ -p_420) -> (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0)
c  in CNF:
c     b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_2
c     b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_1
c     b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨  b^{4, 106}_0
c  in DIMACS:
 7868 -7869  7870  420 -7871 0
 7868 -7869  7870  420 -7872 0
 7868 -7869  7870  420  7873 0

c  1-1 --> 0
c    (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0 ∧ -p_420) -> (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧ -b^{4, 106}_0)
c  in CNF:
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_2
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_1
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_0
c  in DIMACS:
 7868  7869 -7870  420 -7871 0
 7868  7869 -7870  420 -7872 0
 7868  7869 -7870  420 -7873 0

c  0-1 --> -1
c    (-b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧ -p_420) -> ( b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0)
c  in CNF:
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨  b^{4, 106}_2
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_1
c     b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨  b^{4, 106}_0
c  in DIMACS:
 7868  7869  7870  420  7871 0
 7868  7869  7870  420 -7872 0
 7868  7869  7870  420  7873 0

c  -1-1 --> -2
c    ( b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧  b^{4, 105}_0 ∧ -p_420) -> ( b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0)
c  in CNF:
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨  b^{4, 106}_2
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨  b^{4, 106}_1
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨  p_420 ∨ -b^{4, 106}_0
c  in DIMACS:
-7868  7869 -7870  420  7871 0
-7868  7869 -7870  420  7872 0
-7868  7869 -7870  420 -7873 0

c  -2-1 --> break 
c    ( b^{4, 105}_2 ∧  b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨  b^{4, 105}_0 ∨  p_420 ∨ break
c  in DIMACS:
-7868 -7869  7870  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 105}_2 ∧ -b^{4, 105}_1 ∧ -b^{4, 105}_0 ∧ true) 
c  in CNF:
c    -b^{4, 105}_2 ∨  b^{4, 105}_1 ∨  b^{4, 105}_0 ∨ false 
c  in DIMACS:
-7868  7869  7870  0

c  3 does not represent an automaton state.
c    -(-b^{4, 105}_2 ∧  b^{4, 105}_1 ∧  b^{4, 105}_0 ∧ true) 
c  in CNF:
c     b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ false 
c  in DIMACS:
 7868 -7869 -7870  0
c  -3 does not represent an automaton state.
c    -( b^{4, 105}_2 ∧  b^{4, 105}_1 ∧  b^{4, 105}_0 ∧ true) 
c  in CNF:
c    -b^{4, 105}_2 ∨ -b^{4, 105}_1 ∨ -b^{4, 105}_0 ∨ false 
c  in DIMACS:
-7868 -7869 -7870  0

c i = 106
c  -2+1 --> -1
c    ( b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧  p_424) -> ( b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0)
c  in CNF:
c    -b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨  b^{4, 107}_2
c    -b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_1
c    -b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨  b^{4, 107}_0
c  in DIMACS:
-7871 -7872  7873 -424  7874 0
-7871 -7872  7873 -424 -7875 0
-7871 -7872  7873 -424  7876 0

c  -1+1 --> 0
c    ( b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0 ∧  p_424) -> (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧ -b^{4, 107}_0)
c  in CNF:
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_2
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_1
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_0
c  in DIMACS:
-7871  7872 -7873 -424 -7874 0
-7871  7872 -7873 -424 -7875 0
-7871  7872 -7873 -424 -7876 0

c  0+1 --> 1
c    (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧  p_424) -> (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0)
c  in CNF:
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_2
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_1
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨  b^{4, 107}_0
c  in DIMACS:
 7871  7872  7873 -424 -7874 0
 7871  7872  7873 -424 -7875 0
 7871  7872  7873 -424  7876 0

c  1+1 --> 2
c    (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0 ∧  p_424) -> (-b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0)
c  in CNF:
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_2
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨  b^{4, 107}_1
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ -p_424 ∨ -b^{4, 107}_0
c  in DIMACS:
 7871  7872 -7873 -424 -7874 0
 7871  7872 -7873 -424  7875 0
 7871  7872 -7873 -424 -7876 0

c  2+1 --> break 
c    (-b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧  p_424) -> break
c  in CNF:
c     b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 7871 -7872  7873 -424 1162 0


c  2-1 --> 1
c    (-b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧ -p_424) -> (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0)
c  in CNF:
c     b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_2
c     b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_1
c     b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨  b^{4, 107}_0
c  in DIMACS:
 7871 -7872  7873  424 -7874 0
 7871 -7872  7873  424 -7875 0
 7871 -7872  7873  424  7876 0

c  1-1 --> 0
c    (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0 ∧ -p_424) -> (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧ -b^{4, 107}_0)
c  in CNF:
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_2
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_1
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_0
c  in DIMACS:
 7871  7872 -7873  424 -7874 0
 7871  7872 -7873  424 -7875 0
 7871  7872 -7873  424 -7876 0

c  0-1 --> -1
c    (-b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧ -p_424) -> ( b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0)
c  in CNF:
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨  b^{4, 107}_2
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_1
c     b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨  b^{4, 107}_0
c  in DIMACS:
 7871  7872  7873  424  7874 0
 7871  7872  7873  424 -7875 0
 7871  7872  7873  424  7876 0

c  -1-1 --> -2
c    ( b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧  b^{4, 106}_0 ∧ -p_424) -> ( b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0)
c  in CNF:
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨  b^{4, 107}_2
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨  b^{4, 107}_1
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨  p_424 ∨ -b^{4, 107}_0
c  in DIMACS:
-7871  7872 -7873  424  7874 0
-7871  7872 -7873  424  7875 0
-7871  7872 -7873  424 -7876 0

c  -2-1 --> break 
c    ( b^{4, 106}_2 ∧  b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨  b^{4, 106}_0 ∨  p_424 ∨ break
c  in DIMACS:
-7871 -7872  7873  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 106}_2 ∧ -b^{4, 106}_1 ∧ -b^{4, 106}_0 ∧ true) 
c  in CNF:
c    -b^{4, 106}_2 ∨  b^{4, 106}_1 ∨  b^{4, 106}_0 ∨ false 
c  in DIMACS:
-7871  7872  7873  0

c  3 does not represent an automaton state.
c    -(-b^{4, 106}_2 ∧  b^{4, 106}_1 ∧  b^{4, 106}_0 ∧ true) 
c  in CNF:
c     b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ false 
c  in DIMACS:
 7871 -7872 -7873  0
c  -3 does not represent an automaton state.
c    -( b^{4, 106}_2 ∧  b^{4, 106}_1 ∧  b^{4, 106}_0 ∧ true) 
c  in CNF:
c    -b^{4, 106}_2 ∨ -b^{4, 106}_1 ∨ -b^{4, 106}_0 ∨ false 
c  in DIMACS:
-7871 -7872 -7873  0

c i = 107
c  -2+1 --> -1
c    ( b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧  p_428) -> ( b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0)
c  in CNF:
c    -b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨  b^{4, 108}_2
c    -b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_1
c    -b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨  b^{4, 108}_0
c  in DIMACS:
-7874 -7875  7876 -428  7877 0
-7874 -7875  7876 -428 -7878 0
-7874 -7875  7876 -428  7879 0

c  -1+1 --> 0
c    ( b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0 ∧  p_428) -> (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧ -b^{4, 108}_0)
c  in CNF:
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_2
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_1
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_0
c  in DIMACS:
-7874  7875 -7876 -428 -7877 0
-7874  7875 -7876 -428 -7878 0
-7874  7875 -7876 -428 -7879 0

c  0+1 --> 1
c    (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧  p_428) -> (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0)
c  in CNF:
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_2
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_1
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨  b^{4, 108}_0
c  in DIMACS:
 7874  7875  7876 -428 -7877 0
 7874  7875  7876 -428 -7878 0
 7874  7875  7876 -428  7879 0

c  1+1 --> 2
c    (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0 ∧  p_428) -> (-b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0)
c  in CNF:
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_2
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨  b^{4, 108}_1
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ -p_428 ∨ -b^{4, 108}_0
c  in DIMACS:
 7874  7875 -7876 -428 -7877 0
 7874  7875 -7876 -428  7878 0
 7874  7875 -7876 -428 -7879 0

c  2+1 --> break 
c    (-b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧  p_428) -> break
c  in CNF:
c     b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ -p_428 ∨ break
c  in DIMACS:
 7874 -7875  7876 -428 1162 0


c  2-1 --> 1
c    (-b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧ -p_428) -> (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0)
c  in CNF:
c     b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_2
c     b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_1
c     b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨  b^{4, 108}_0
c  in DIMACS:
 7874 -7875  7876  428 -7877 0
 7874 -7875  7876  428 -7878 0
 7874 -7875  7876  428  7879 0

c  1-1 --> 0
c    (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0 ∧ -p_428) -> (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧ -b^{4, 108}_0)
c  in CNF:
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_2
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_1
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_0
c  in DIMACS:
 7874  7875 -7876  428 -7877 0
 7874  7875 -7876  428 -7878 0
 7874  7875 -7876  428 -7879 0

c  0-1 --> -1
c    (-b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧ -p_428) -> ( b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0)
c  in CNF:
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨  b^{4, 108}_2
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_1
c     b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨  b^{4, 108}_0
c  in DIMACS:
 7874  7875  7876  428  7877 0
 7874  7875  7876  428 -7878 0
 7874  7875  7876  428  7879 0

c  -1-1 --> -2
c    ( b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧  b^{4, 107}_0 ∧ -p_428) -> ( b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0)
c  in CNF:
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨  b^{4, 108}_2
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨  b^{4, 108}_1
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨  p_428 ∨ -b^{4, 108}_0
c  in DIMACS:
-7874  7875 -7876  428  7877 0
-7874  7875 -7876  428  7878 0
-7874  7875 -7876  428 -7879 0

c  -2-1 --> break 
c    ( b^{4, 107}_2 ∧  b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧ -p_428) -> break
c  in CNF:
c    -b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨  b^{4, 107}_0 ∨  p_428 ∨ break
c  in DIMACS:
-7874 -7875  7876  428 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 107}_2 ∧ -b^{4, 107}_1 ∧ -b^{4, 107}_0 ∧ true) 
c  in CNF:
c    -b^{4, 107}_2 ∨  b^{4, 107}_1 ∨  b^{4, 107}_0 ∨ false 
c  in DIMACS:
-7874  7875  7876  0

c  3 does not represent an automaton state.
c    -(-b^{4, 107}_2 ∧  b^{4, 107}_1 ∧  b^{4, 107}_0 ∧ true) 
c  in CNF:
c     b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ false 
c  in DIMACS:
 7874 -7875 -7876  0
c  -3 does not represent an automaton state.
c    -( b^{4, 107}_2 ∧  b^{4, 107}_1 ∧  b^{4, 107}_0 ∧ true) 
c  in CNF:
c    -b^{4, 107}_2 ∨ -b^{4, 107}_1 ∨ -b^{4, 107}_0 ∨ false 
c  in DIMACS:
-7874 -7875 -7876  0

c i = 108
c  -2+1 --> -1
c    ( b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧  p_432) -> ( b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0)
c  in CNF:
c    -b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨  b^{4, 109}_2
c    -b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_1
c    -b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨  b^{4, 109}_0
c  in DIMACS:
-7877 -7878  7879 -432  7880 0
-7877 -7878  7879 -432 -7881 0
-7877 -7878  7879 -432  7882 0

c  -1+1 --> 0
c    ( b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0 ∧  p_432) -> (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧ -b^{4, 109}_0)
c  in CNF:
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_2
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_1
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_0
c  in DIMACS:
-7877  7878 -7879 -432 -7880 0
-7877  7878 -7879 -432 -7881 0
-7877  7878 -7879 -432 -7882 0

c  0+1 --> 1
c    (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧  p_432) -> (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0)
c  in CNF:
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_2
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_1
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨  b^{4, 109}_0
c  in DIMACS:
 7877  7878  7879 -432 -7880 0
 7877  7878  7879 -432 -7881 0
 7877  7878  7879 -432  7882 0

c  1+1 --> 2
c    (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0 ∧  p_432) -> (-b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0)
c  in CNF:
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_2
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨  b^{4, 109}_1
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ -p_432 ∨ -b^{4, 109}_0
c  in DIMACS:
 7877  7878 -7879 -432 -7880 0
 7877  7878 -7879 -432  7881 0
 7877  7878 -7879 -432 -7882 0

c  2+1 --> break 
c    (-b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧  p_432) -> break
c  in CNF:
c     b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 7877 -7878  7879 -432 1162 0


c  2-1 --> 1
c    (-b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧ -p_432) -> (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0)
c  in CNF:
c     b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_2
c     b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_1
c     b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨  b^{4, 109}_0
c  in DIMACS:
 7877 -7878  7879  432 -7880 0
 7877 -7878  7879  432 -7881 0
 7877 -7878  7879  432  7882 0

c  1-1 --> 0
c    (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0 ∧ -p_432) -> (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧ -b^{4, 109}_0)
c  in CNF:
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_2
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_1
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_0
c  in DIMACS:
 7877  7878 -7879  432 -7880 0
 7877  7878 -7879  432 -7881 0
 7877  7878 -7879  432 -7882 0

c  0-1 --> -1
c    (-b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧ -p_432) -> ( b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0)
c  in CNF:
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨  b^{4, 109}_2
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_1
c     b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨  b^{4, 109}_0
c  in DIMACS:
 7877  7878  7879  432  7880 0
 7877  7878  7879  432 -7881 0
 7877  7878  7879  432  7882 0

c  -1-1 --> -2
c    ( b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧  b^{4, 108}_0 ∧ -p_432) -> ( b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0)
c  in CNF:
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨  b^{4, 109}_2
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨  b^{4, 109}_1
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨  p_432 ∨ -b^{4, 109}_0
c  in DIMACS:
-7877  7878 -7879  432  7880 0
-7877  7878 -7879  432  7881 0
-7877  7878 -7879  432 -7882 0

c  -2-1 --> break 
c    ( b^{4, 108}_2 ∧  b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨  b^{4, 108}_0 ∨  p_432 ∨ break
c  in DIMACS:
-7877 -7878  7879  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 108}_2 ∧ -b^{4, 108}_1 ∧ -b^{4, 108}_0 ∧ true) 
c  in CNF:
c    -b^{4, 108}_2 ∨  b^{4, 108}_1 ∨  b^{4, 108}_0 ∨ false 
c  in DIMACS:
-7877  7878  7879  0

c  3 does not represent an automaton state.
c    -(-b^{4, 108}_2 ∧  b^{4, 108}_1 ∧  b^{4, 108}_0 ∧ true) 
c  in CNF:
c     b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ false 
c  in DIMACS:
 7877 -7878 -7879  0
c  -3 does not represent an automaton state.
c    -( b^{4, 108}_2 ∧  b^{4, 108}_1 ∧  b^{4, 108}_0 ∧ true) 
c  in CNF:
c    -b^{4, 108}_2 ∨ -b^{4, 108}_1 ∨ -b^{4, 108}_0 ∨ false 
c  in DIMACS:
-7877 -7878 -7879  0

c i = 109
c  -2+1 --> -1
c    ( b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧  p_436) -> ( b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0)
c  in CNF:
c    -b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨  b^{4, 110}_2
c    -b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_1
c    -b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨  b^{4, 110}_0
c  in DIMACS:
-7880 -7881  7882 -436  7883 0
-7880 -7881  7882 -436 -7884 0
-7880 -7881  7882 -436  7885 0

c  -1+1 --> 0
c    ( b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0 ∧  p_436) -> (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧ -b^{4, 110}_0)
c  in CNF:
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_2
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_1
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_0
c  in DIMACS:
-7880  7881 -7882 -436 -7883 0
-7880  7881 -7882 -436 -7884 0
-7880  7881 -7882 -436 -7885 0

c  0+1 --> 1
c    (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧  p_436) -> (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0)
c  in CNF:
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_2
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_1
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨  b^{4, 110}_0
c  in DIMACS:
 7880  7881  7882 -436 -7883 0
 7880  7881  7882 -436 -7884 0
 7880  7881  7882 -436  7885 0

c  1+1 --> 2
c    (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0 ∧  p_436) -> (-b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0)
c  in CNF:
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_2
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨  b^{4, 110}_1
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ -p_436 ∨ -b^{4, 110}_0
c  in DIMACS:
 7880  7881 -7882 -436 -7883 0
 7880  7881 -7882 -436  7884 0
 7880  7881 -7882 -436 -7885 0

c  2+1 --> break 
c    (-b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧  p_436) -> break
c  in CNF:
c     b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ -p_436 ∨ break
c  in DIMACS:
 7880 -7881  7882 -436 1162 0


c  2-1 --> 1
c    (-b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧ -p_436) -> (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0)
c  in CNF:
c     b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_2
c     b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_1
c     b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨  b^{4, 110}_0
c  in DIMACS:
 7880 -7881  7882  436 -7883 0
 7880 -7881  7882  436 -7884 0
 7880 -7881  7882  436  7885 0

c  1-1 --> 0
c    (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0 ∧ -p_436) -> (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧ -b^{4, 110}_0)
c  in CNF:
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_2
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_1
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_0
c  in DIMACS:
 7880  7881 -7882  436 -7883 0
 7880  7881 -7882  436 -7884 0
 7880  7881 -7882  436 -7885 0

c  0-1 --> -1
c    (-b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧ -p_436) -> ( b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0)
c  in CNF:
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨  b^{4, 110}_2
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_1
c     b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨  b^{4, 110}_0
c  in DIMACS:
 7880  7881  7882  436  7883 0
 7880  7881  7882  436 -7884 0
 7880  7881  7882  436  7885 0

c  -1-1 --> -2
c    ( b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧  b^{4, 109}_0 ∧ -p_436) -> ( b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0)
c  in CNF:
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨  b^{4, 110}_2
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨  b^{4, 110}_1
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨  p_436 ∨ -b^{4, 110}_0
c  in DIMACS:
-7880  7881 -7882  436  7883 0
-7880  7881 -7882  436  7884 0
-7880  7881 -7882  436 -7885 0

c  -2-1 --> break 
c    ( b^{4, 109}_2 ∧  b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧ -p_436) -> break
c  in CNF:
c    -b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨  b^{4, 109}_0 ∨  p_436 ∨ break
c  in DIMACS:
-7880 -7881  7882  436 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 109}_2 ∧ -b^{4, 109}_1 ∧ -b^{4, 109}_0 ∧ true) 
c  in CNF:
c    -b^{4, 109}_2 ∨  b^{4, 109}_1 ∨  b^{4, 109}_0 ∨ false 
c  in DIMACS:
-7880  7881  7882  0

c  3 does not represent an automaton state.
c    -(-b^{4, 109}_2 ∧  b^{4, 109}_1 ∧  b^{4, 109}_0 ∧ true) 
c  in CNF:
c     b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ false 
c  in DIMACS:
 7880 -7881 -7882  0
c  -3 does not represent an automaton state.
c    -( b^{4, 109}_2 ∧  b^{4, 109}_1 ∧  b^{4, 109}_0 ∧ true) 
c  in CNF:
c    -b^{4, 109}_2 ∨ -b^{4, 109}_1 ∨ -b^{4, 109}_0 ∨ false 
c  in DIMACS:
-7880 -7881 -7882  0

c i = 110
c  -2+1 --> -1
c    ( b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧  p_440) -> ( b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0)
c  in CNF:
c    -b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨  b^{4, 111}_2
c    -b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_1
c    -b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨  b^{4, 111}_0
c  in DIMACS:
-7883 -7884  7885 -440  7886 0
-7883 -7884  7885 -440 -7887 0
-7883 -7884  7885 -440  7888 0

c  -1+1 --> 0
c    ( b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0 ∧  p_440) -> (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧ -b^{4, 111}_0)
c  in CNF:
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_2
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_1
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_0
c  in DIMACS:
-7883  7884 -7885 -440 -7886 0
-7883  7884 -7885 -440 -7887 0
-7883  7884 -7885 -440 -7888 0

c  0+1 --> 1
c    (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧  p_440) -> (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0)
c  in CNF:
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_2
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_1
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨  b^{4, 111}_0
c  in DIMACS:
 7883  7884  7885 -440 -7886 0
 7883  7884  7885 -440 -7887 0
 7883  7884  7885 -440  7888 0

c  1+1 --> 2
c    (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0 ∧  p_440) -> (-b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0)
c  in CNF:
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_2
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨  b^{4, 111}_1
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ -p_440 ∨ -b^{4, 111}_0
c  in DIMACS:
 7883  7884 -7885 -440 -7886 0
 7883  7884 -7885 -440  7887 0
 7883  7884 -7885 -440 -7888 0

c  2+1 --> break 
c    (-b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧  p_440) -> break
c  in CNF:
c     b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 7883 -7884  7885 -440 1162 0


c  2-1 --> 1
c    (-b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧ -p_440) -> (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0)
c  in CNF:
c     b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_2
c     b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_1
c     b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨  b^{4, 111}_0
c  in DIMACS:
 7883 -7884  7885  440 -7886 0
 7883 -7884  7885  440 -7887 0
 7883 -7884  7885  440  7888 0

c  1-1 --> 0
c    (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0 ∧ -p_440) -> (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧ -b^{4, 111}_0)
c  in CNF:
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_2
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_1
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_0
c  in DIMACS:
 7883  7884 -7885  440 -7886 0
 7883  7884 -7885  440 -7887 0
 7883  7884 -7885  440 -7888 0

c  0-1 --> -1
c    (-b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧ -p_440) -> ( b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0)
c  in CNF:
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨  b^{4, 111}_2
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_1
c     b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨  b^{4, 111}_0
c  in DIMACS:
 7883  7884  7885  440  7886 0
 7883  7884  7885  440 -7887 0
 7883  7884  7885  440  7888 0

c  -1-1 --> -2
c    ( b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧  b^{4, 110}_0 ∧ -p_440) -> ( b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0)
c  in CNF:
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨  b^{4, 111}_2
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨  b^{4, 111}_1
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨  p_440 ∨ -b^{4, 111}_0
c  in DIMACS:
-7883  7884 -7885  440  7886 0
-7883  7884 -7885  440  7887 0
-7883  7884 -7885  440 -7888 0

c  -2-1 --> break 
c    ( b^{4, 110}_2 ∧  b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨  b^{4, 110}_0 ∨  p_440 ∨ break
c  in DIMACS:
-7883 -7884  7885  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 110}_2 ∧ -b^{4, 110}_1 ∧ -b^{4, 110}_0 ∧ true) 
c  in CNF:
c    -b^{4, 110}_2 ∨  b^{4, 110}_1 ∨  b^{4, 110}_0 ∨ false 
c  in DIMACS:
-7883  7884  7885  0

c  3 does not represent an automaton state.
c    -(-b^{4, 110}_2 ∧  b^{4, 110}_1 ∧  b^{4, 110}_0 ∧ true) 
c  in CNF:
c     b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ false 
c  in DIMACS:
 7883 -7884 -7885  0
c  -3 does not represent an automaton state.
c    -( b^{4, 110}_2 ∧  b^{4, 110}_1 ∧  b^{4, 110}_0 ∧ true) 
c  in CNF:
c    -b^{4, 110}_2 ∨ -b^{4, 110}_1 ∨ -b^{4, 110}_0 ∨ false 
c  in DIMACS:
-7883 -7884 -7885  0

c i = 111
c  -2+1 --> -1
c    ( b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧  p_444) -> ( b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0)
c  in CNF:
c    -b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨  b^{4, 112}_2
c    -b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_1
c    -b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨  b^{4, 112}_0
c  in DIMACS:
-7886 -7887  7888 -444  7889 0
-7886 -7887  7888 -444 -7890 0
-7886 -7887  7888 -444  7891 0

c  -1+1 --> 0
c    ( b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0 ∧  p_444) -> (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧ -b^{4, 112}_0)
c  in CNF:
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_2
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_1
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_0
c  in DIMACS:
-7886  7887 -7888 -444 -7889 0
-7886  7887 -7888 -444 -7890 0
-7886  7887 -7888 -444 -7891 0

c  0+1 --> 1
c    (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧  p_444) -> (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0)
c  in CNF:
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_2
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_1
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨  b^{4, 112}_0
c  in DIMACS:
 7886  7887  7888 -444 -7889 0
 7886  7887  7888 -444 -7890 0
 7886  7887  7888 -444  7891 0

c  1+1 --> 2
c    (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0 ∧  p_444) -> (-b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0)
c  in CNF:
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_2
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨  b^{4, 112}_1
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ -p_444 ∨ -b^{4, 112}_0
c  in DIMACS:
 7886  7887 -7888 -444 -7889 0
 7886  7887 -7888 -444  7890 0
 7886  7887 -7888 -444 -7891 0

c  2+1 --> break 
c    (-b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧  p_444) -> break
c  in CNF:
c     b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 7886 -7887  7888 -444 1162 0


c  2-1 --> 1
c    (-b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧ -p_444) -> (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0)
c  in CNF:
c     b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_2
c     b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_1
c     b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨  b^{4, 112}_0
c  in DIMACS:
 7886 -7887  7888  444 -7889 0
 7886 -7887  7888  444 -7890 0
 7886 -7887  7888  444  7891 0

c  1-1 --> 0
c    (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0 ∧ -p_444) -> (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧ -b^{4, 112}_0)
c  in CNF:
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_2
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_1
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_0
c  in DIMACS:
 7886  7887 -7888  444 -7889 0
 7886  7887 -7888  444 -7890 0
 7886  7887 -7888  444 -7891 0

c  0-1 --> -1
c    (-b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧ -p_444) -> ( b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0)
c  in CNF:
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨  b^{4, 112}_2
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_1
c     b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨  b^{4, 112}_0
c  in DIMACS:
 7886  7887  7888  444  7889 0
 7886  7887  7888  444 -7890 0
 7886  7887  7888  444  7891 0

c  -1-1 --> -2
c    ( b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧  b^{4, 111}_0 ∧ -p_444) -> ( b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0)
c  in CNF:
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨  b^{4, 112}_2
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨  b^{4, 112}_1
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨  p_444 ∨ -b^{4, 112}_0
c  in DIMACS:
-7886  7887 -7888  444  7889 0
-7886  7887 -7888  444  7890 0
-7886  7887 -7888  444 -7891 0

c  -2-1 --> break 
c    ( b^{4, 111}_2 ∧  b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨  b^{4, 111}_0 ∨  p_444 ∨ break
c  in DIMACS:
-7886 -7887  7888  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 111}_2 ∧ -b^{4, 111}_1 ∧ -b^{4, 111}_0 ∧ true) 
c  in CNF:
c    -b^{4, 111}_2 ∨  b^{4, 111}_1 ∨  b^{4, 111}_0 ∨ false 
c  in DIMACS:
-7886  7887  7888  0

c  3 does not represent an automaton state.
c    -(-b^{4, 111}_2 ∧  b^{4, 111}_1 ∧  b^{4, 111}_0 ∧ true) 
c  in CNF:
c     b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ false 
c  in DIMACS:
 7886 -7887 -7888  0
c  -3 does not represent an automaton state.
c    -( b^{4, 111}_2 ∧  b^{4, 111}_1 ∧  b^{4, 111}_0 ∧ true) 
c  in CNF:
c    -b^{4, 111}_2 ∨ -b^{4, 111}_1 ∨ -b^{4, 111}_0 ∨ false 
c  in DIMACS:
-7886 -7887 -7888  0

c i = 112
c  -2+1 --> -1
c    ( b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧  p_448) -> ( b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0)
c  in CNF:
c    -b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨  b^{4, 113}_2
c    -b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_1
c    -b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨  b^{4, 113}_0
c  in DIMACS:
-7889 -7890  7891 -448  7892 0
-7889 -7890  7891 -448 -7893 0
-7889 -7890  7891 -448  7894 0

c  -1+1 --> 0
c    ( b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0 ∧  p_448) -> (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧ -b^{4, 113}_0)
c  in CNF:
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_2
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_1
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_0
c  in DIMACS:
-7889  7890 -7891 -448 -7892 0
-7889  7890 -7891 -448 -7893 0
-7889  7890 -7891 -448 -7894 0

c  0+1 --> 1
c    (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧  p_448) -> (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0)
c  in CNF:
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_2
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_1
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨  b^{4, 113}_0
c  in DIMACS:
 7889  7890  7891 -448 -7892 0
 7889  7890  7891 -448 -7893 0
 7889  7890  7891 -448  7894 0

c  1+1 --> 2
c    (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0 ∧  p_448) -> (-b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0)
c  in CNF:
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_2
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨  b^{4, 113}_1
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ -p_448 ∨ -b^{4, 113}_0
c  in DIMACS:
 7889  7890 -7891 -448 -7892 0
 7889  7890 -7891 -448  7893 0
 7889  7890 -7891 -448 -7894 0

c  2+1 --> break 
c    (-b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧  p_448) -> break
c  in CNF:
c     b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 7889 -7890  7891 -448 1162 0


c  2-1 --> 1
c    (-b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧ -p_448) -> (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0)
c  in CNF:
c     b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_2
c     b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_1
c     b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨  b^{4, 113}_0
c  in DIMACS:
 7889 -7890  7891  448 -7892 0
 7889 -7890  7891  448 -7893 0
 7889 -7890  7891  448  7894 0

c  1-1 --> 0
c    (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0 ∧ -p_448) -> (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧ -b^{4, 113}_0)
c  in CNF:
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_2
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_1
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_0
c  in DIMACS:
 7889  7890 -7891  448 -7892 0
 7889  7890 -7891  448 -7893 0
 7889  7890 -7891  448 -7894 0

c  0-1 --> -1
c    (-b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧ -p_448) -> ( b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0)
c  in CNF:
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨  b^{4, 113}_2
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_1
c     b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨  b^{4, 113}_0
c  in DIMACS:
 7889  7890  7891  448  7892 0
 7889  7890  7891  448 -7893 0
 7889  7890  7891  448  7894 0

c  -1-1 --> -2
c    ( b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧  b^{4, 112}_0 ∧ -p_448) -> ( b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0)
c  in CNF:
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨  b^{4, 113}_2
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨  b^{4, 113}_1
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨  p_448 ∨ -b^{4, 113}_0
c  in DIMACS:
-7889  7890 -7891  448  7892 0
-7889  7890 -7891  448  7893 0
-7889  7890 -7891  448 -7894 0

c  -2-1 --> break 
c    ( b^{4, 112}_2 ∧  b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨  b^{4, 112}_0 ∨  p_448 ∨ break
c  in DIMACS:
-7889 -7890  7891  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 112}_2 ∧ -b^{4, 112}_1 ∧ -b^{4, 112}_0 ∧ true) 
c  in CNF:
c    -b^{4, 112}_2 ∨  b^{4, 112}_1 ∨  b^{4, 112}_0 ∨ false 
c  in DIMACS:
-7889  7890  7891  0

c  3 does not represent an automaton state.
c    -(-b^{4, 112}_2 ∧  b^{4, 112}_1 ∧  b^{4, 112}_0 ∧ true) 
c  in CNF:
c     b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ false 
c  in DIMACS:
 7889 -7890 -7891  0
c  -3 does not represent an automaton state.
c    -( b^{4, 112}_2 ∧  b^{4, 112}_1 ∧  b^{4, 112}_0 ∧ true) 
c  in CNF:
c    -b^{4, 112}_2 ∨ -b^{4, 112}_1 ∨ -b^{4, 112}_0 ∨ false 
c  in DIMACS:
-7889 -7890 -7891  0

c i = 113
c  -2+1 --> -1
c    ( b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧  p_452) -> ( b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0)
c  in CNF:
c    -b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨  b^{4, 114}_2
c    -b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_1
c    -b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨  b^{4, 114}_0
c  in DIMACS:
-7892 -7893  7894 -452  7895 0
-7892 -7893  7894 -452 -7896 0
-7892 -7893  7894 -452  7897 0

c  -1+1 --> 0
c    ( b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0 ∧  p_452) -> (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧ -b^{4, 114}_0)
c  in CNF:
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_2
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_1
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_0
c  in DIMACS:
-7892  7893 -7894 -452 -7895 0
-7892  7893 -7894 -452 -7896 0
-7892  7893 -7894 -452 -7897 0

c  0+1 --> 1
c    (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧  p_452) -> (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0)
c  in CNF:
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_2
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_1
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨  b^{4, 114}_0
c  in DIMACS:
 7892  7893  7894 -452 -7895 0
 7892  7893  7894 -452 -7896 0
 7892  7893  7894 -452  7897 0

c  1+1 --> 2
c    (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0 ∧  p_452) -> (-b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0)
c  in CNF:
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_2
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨  b^{4, 114}_1
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ -p_452 ∨ -b^{4, 114}_0
c  in DIMACS:
 7892  7893 -7894 -452 -7895 0
 7892  7893 -7894 -452  7896 0
 7892  7893 -7894 -452 -7897 0

c  2+1 --> break 
c    (-b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧  p_452) -> break
c  in CNF:
c     b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ -p_452 ∨ break
c  in DIMACS:
 7892 -7893  7894 -452 1162 0


c  2-1 --> 1
c    (-b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧ -p_452) -> (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0)
c  in CNF:
c     b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_2
c     b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_1
c     b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨  b^{4, 114}_0
c  in DIMACS:
 7892 -7893  7894  452 -7895 0
 7892 -7893  7894  452 -7896 0
 7892 -7893  7894  452  7897 0

c  1-1 --> 0
c    (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0 ∧ -p_452) -> (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧ -b^{4, 114}_0)
c  in CNF:
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_2
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_1
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_0
c  in DIMACS:
 7892  7893 -7894  452 -7895 0
 7892  7893 -7894  452 -7896 0
 7892  7893 -7894  452 -7897 0

c  0-1 --> -1
c    (-b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧ -p_452) -> ( b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0)
c  in CNF:
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨  b^{4, 114}_2
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_1
c     b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨  b^{4, 114}_0
c  in DIMACS:
 7892  7893  7894  452  7895 0
 7892  7893  7894  452 -7896 0
 7892  7893  7894  452  7897 0

c  -1-1 --> -2
c    ( b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧  b^{4, 113}_0 ∧ -p_452) -> ( b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0)
c  in CNF:
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨  b^{4, 114}_2
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨  b^{4, 114}_1
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨  p_452 ∨ -b^{4, 114}_0
c  in DIMACS:
-7892  7893 -7894  452  7895 0
-7892  7893 -7894  452  7896 0
-7892  7893 -7894  452 -7897 0

c  -2-1 --> break 
c    ( b^{4, 113}_2 ∧  b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧ -p_452) -> break
c  in CNF:
c    -b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨  b^{4, 113}_0 ∨  p_452 ∨ break
c  in DIMACS:
-7892 -7893  7894  452 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 113}_2 ∧ -b^{4, 113}_1 ∧ -b^{4, 113}_0 ∧ true) 
c  in CNF:
c    -b^{4, 113}_2 ∨  b^{4, 113}_1 ∨  b^{4, 113}_0 ∨ false 
c  in DIMACS:
-7892  7893  7894  0

c  3 does not represent an automaton state.
c    -(-b^{4, 113}_2 ∧  b^{4, 113}_1 ∧  b^{4, 113}_0 ∧ true) 
c  in CNF:
c     b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ false 
c  in DIMACS:
 7892 -7893 -7894  0
c  -3 does not represent an automaton state.
c    -( b^{4, 113}_2 ∧  b^{4, 113}_1 ∧  b^{4, 113}_0 ∧ true) 
c  in CNF:
c    -b^{4, 113}_2 ∨ -b^{4, 113}_1 ∨ -b^{4, 113}_0 ∨ false 
c  in DIMACS:
-7892 -7893 -7894  0

c i = 114
c  -2+1 --> -1
c    ( b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧  p_456) -> ( b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0)
c  in CNF:
c    -b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨  b^{4, 115}_2
c    -b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_1
c    -b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨  b^{4, 115}_0
c  in DIMACS:
-7895 -7896  7897 -456  7898 0
-7895 -7896  7897 -456 -7899 0
-7895 -7896  7897 -456  7900 0

c  -1+1 --> 0
c    ( b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0 ∧  p_456) -> (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧ -b^{4, 115}_0)
c  in CNF:
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_2
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_1
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_0
c  in DIMACS:
-7895  7896 -7897 -456 -7898 0
-7895  7896 -7897 -456 -7899 0
-7895  7896 -7897 -456 -7900 0

c  0+1 --> 1
c    (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧  p_456) -> (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0)
c  in CNF:
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_2
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_1
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨  b^{4, 115}_0
c  in DIMACS:
 7895  7896  7897 -456 -7898 0
 7895  7896  7897 -456 -7899 0
 7895  7896  7897 -456  7900 0

c  1+1 --> 2
c    (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0 ∧  p_456) -> (-b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0)
c  in CNF:
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_2
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨  b^{4, 115}_1
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ -p_456 ∨ -b^{4, 115}_0
c  in DIMACS:
 7895  7896 -7897 -456 -7898 0
 7895  7896 -7897 -456  7899 0
 7895  7896 -7897 -456 -7900 0

c  2+1 --> break 
c    (-b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧  p_456) -> break
c  in CNF:
c     b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 7895 -7896  7897 -456 1162 0


c  2-1 --> 1
c    (-b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧ -p_456) -> (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0)
c  in CNF:
c     b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_2
c     b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_1
c     b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨  b^{4, 115}_0
c  in DIMACS:
 7895 -7896  7897  456 -7898 0
 7895 -7896  7897  456 -7899 0
 7895 -7896  7897  456  7900 0

c  1-1 --> 0
c    (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0 ∧ -p_456) -> (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧ -b^{4, 115}_0)
c  in CNF:
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_2
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_1
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_0
c  in DIMACS:
 7895  7896 -7897  456 -7898 0
 7895  7896 -7897  456 -7899 0
 7895  7896 -7897  456 -7900 0

c  0-1 --> -1
c    (-b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧ -p_456) -> ( b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0)
c  in CNF:
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨  b^{4, 115}_2
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_1
c     b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨  b^{4, 115}_0
c  in DIMACS:
 7895  7896  7897  456  7898 0
 7895  7896  7897  456 -7899 0
 7895  7896  7897  456  7900 0

c  -1-1 --> -2
c    ( b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧  b^{4, 114}_0 ∧ -p_456) -> ( b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0)
c  in CNF:
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨  b^{4, 115}_2
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨  b^{4, 115}_1
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨  p_456 ∨ -b^{4, 115}_0
c  in DIMACS:
-7895  7896 -7897  456  7898 0
-7895  7896 -7897  456  7899 0
-7895  7896 -7897  456 -7900 0

c  -2-1 --> break 
c    ( b^{4, 114}_2 ∧  b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨  b^{4, 114}_0 ∨  p_456 ∨ break
c  in DIMACS:
-7895 -7896  7897  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 114}_2 ∧ -b^{4, 114}_1 ∧ -b^{4, 114}_0 ∧ true) 
c  in CNF:
c    -b^{4, 114}_2 ∨  b^{4, 114}_1 ∨  b^{4, 114}_0 ∨ false 
c  in DIMACS:
-7895  7896  7897  0

c  3 does not represent an automaton state.
c    -(-b^{4, 114}_2 ∧  b^{4, 114}_1 ∧  b^{4, 114}_0 ∧ true) 
c  in CNF:
c     b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ false 
c  in DIMACS:
 7895 -7896 -7897  0
c  -3 does not represent an automaton state.
c    -( b^{4, 114}_2 ∧  b^{4, 114}_1 ∧  b^{4, 114}_0 ∧ true) 
c  in CNF:
c    -b^{4, 114}_2 ∨ -b^{4, 114}_1 ∨ -b^{4, 114}_0 ∨ false 
c  in DIMACS:
-7895 -7896 -7897  0

c i = 115
c  -2+1 --> -1
c    ( b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧  p_460) -> ( b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0)
c  in CNF:
c    -b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨  b^{4, 116}_2
c    -b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_1
c    -b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨  b^{4, 116}_0
c  in DIMACS:
-7898 -7899  7900 -460  7901 0
-7898 -7899  7900 -460 -7902 0
-7898 -7899  7900 -460  7903 0

c  -1+1 --> 0
c    ( b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0 ∧  p_460) -> (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧ -b^{4, 116}_0)
c  in CNF:
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_2
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_1
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_0
c  in DIMACS:
-7898  7899 -7900 -460 -7901 0
-7898  7899 -7900 -460 -7902 0
-7898  7899 -7900 -460 -7903 0

c  0+1 --> 1
c    (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧  p_460) -> (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0)
c  in CNF:
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_2
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_1
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨  b^{4, 116}_0
c  in DIMACS:
 7898  7899  7900 -460 -7901 0
 7898  7899  7900 -460 -7902 0
 7898  7899  7900 -460  7903 0

c  1+1 --> 2
c    (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0 ∧  p_460) -> (-b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0)
c  in CNF:
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_2
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨  b^{4, 116}_1
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ -p_460 ∨ -b^{4, 116}_0
c  in DIMACS:
 7898  7899 -7900 -460 -7901 0
 7898  7899 -7900 -460  7902 0
 7898  7899 -7900 -460 -7903 0

c  2+1 --> break 
c    (-b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧  p_460) -> break
c  in CNF:
c     b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 7898 -7899  7900 -460 1162 0


c  2-1 --> 1
c    (-b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧ -p_460) -> (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0)
c  in CNF:
c     b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_2
c     b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_1
c     b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨  b^{4, 116}_0
c  in DIMACS:
 7898 -7899  7900  460 -7901 0
 7898 -7899  7900  460 -7902 0
 7898 -7899  7900  460  7903 0

c  1-1 --> 0
c    (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0 ∧ -p_460) -> (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧ -b^{4, 116}_0)
c  in CNF:
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_2
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_1
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_0
c  in DIMACS:
 7898  7899 -7900  460 -7901 0
 7898  7899 -7900  460 -7902 0
 7898  7899 -7900  460 -7903 0

c  0-1 --> -1
c    (-b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧ -p_460) -> ( b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0)
c  in CNF:
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨  b^{4, 116}_2
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_1
c     b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨  b^{4, 116}_0
c  in DIMACS:
 7898  7899  7900  460  7901 0
 7898  7899  7900  460 -7902 0
 7898  7899  7900  460  7903 0

c  -1-1 --> -2
c    ( b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧  b^{4, 115}_0 ∧ -p_460) -> ( b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0)
c  in CNF:
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨  b^{4, 116}_2
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨  b^{4, 116}_1
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨  p_460 ∨ -b^{4, 116}_0
c  in DIMACS:
-7898  7899 -7900  460  7901 0
-7898  7899 -7900  460  7902 0
-7898  7899 -7900  460 -7903 0

c  -2-1 --> break 
c    ( b^{4, 115}_2 ∧  b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨  b^{4, 115}_0 ∨  p_460 ∨ break
c  in DIMACS:
-7898 -7899  7900  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 115}_2 ∧ -b^{4, 115}_1 ∧ -b^{4, 115}_0 ∧ true) 
c  in CNF:
c    -b^{4, 115}_2 ∨  b^{4, 115}_1 ∨  b^{4, 115}_0 ∨ false 
c  in DIMACS:
-7898  7899  7900  0

c  3 does not represent an automaton state.
c    -(-b^{4, 115}_2 ∧  b^{4, 115}_1 ∧  b^{4, 115}_0 ∧ true) 
c  in CNF:
c     b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ false 
c  in DIMACS:
 7898 -7899 -7900  0
c  -3 does not represent an automaton state.
c    -( b^{4, 115}_2 ∧  b^{4, 115}_1 ∧  b^{4, 115}_0 ∧ true) 
c  in CNF:
c    -b^{4, 115}_2 ∨ -b^{4, 115}_1 ∨ -b^{4, 115}_0 ∨ false 
c  in DIMACS:
-7898 -7899 -7900  0

c i = 116
c  -2+1 --> -1
c    ( b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧  p_464) -> ( b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0)
c  in CNF:
c    -b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨  b^{4, 117}_2
c    -b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_1
c    -b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨  b^{4, 117}_0
c  in DIMACS:
-7901 -7902  7903 -464  7904 0
-7901 -7902  7903 -464 -7905 0
-7901 -7902  7903 -464  7906 0

c  -1+1 --> 0
c    ( b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0 ∧  p_464) -> (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧ -b^{4, 117}_0)
c  in CNF:
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_2
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_1
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_0
c  in DIMACS:
-7901  7902 -7903 -464 -7904 0
-7901  7902 -7903 -464 -7905 0
-7901  7902 -7903 -464 -7906 0

c  0+1 --> 1
c    (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧  p_464) -> (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0)
c  in CNF:
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_2
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_1
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨  b^{4, 117}_0
c  in DIMACS:
 7901  7902  7903 -464 -7904 0
 7901  7902  7903 -464 -7905 0
 7901  7902  7903 -464  7906 0

c  1+1 --> 2
c    (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0 ∧  p_464) -> (-b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0)
c  in CNF:
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_2
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨  b^{4, 117}_1
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ -p_464 ∨ -b^{4, 117}_0
c  in DIMACS:
 7901  7902 -7903 -464 -7904 0
 7901  7902 -7903 -464  7905 0
 7901  7902 -7903 -464 -7906 0

c  2+1 --> break 
c    (-b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧  p_464) -> break
c  in CNF:
c     b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 7901 -7902  7903 -464 1162 0


c  2-1 --> 1
c    (-b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧ -p_464) -> (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0)
c  in CNF:
c     b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_2
c     b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_1
c     b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨  b^{4, 117}_0
c  in DIMACS:
 7901 -7902  7903  464 -7904 0
 7901 -7902  7903  464 -7905 0
 7901 -7902  7903  464  7906 0

c  1-1 --> 0
c    (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0 ∧ -p_464) -> (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧ -b^{4, 117}_0)
c  in CNF:
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_2
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_1
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_0
c  in DIMACS:
 7901  7902 -7903  464 -7904 0
 7901  7902 -7903  464 -7905 0
 7901  7902 -7903  464 -7906 0

c  0-1 --> -1
c    (-b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧ -p_464) -> ( b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0)
c  in CNF:
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨  b^{4, 117}_2
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_1
c     b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨  b^{4, 117}_0
c  in DIMACS:
 7901  7902  7903  464  7904 0
 7901  7902  7903  464 -7905 0
 7901  7902  7903  464  7906 0

c  -1-1 --> -2
c    ( b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧  b^{4, 116}_0 ∧ -p_464) -> ( b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0)
c  in CNF:
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨  b^{4, 117}_2
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨  b^{4, 117}_1
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨  p_464 ∨ -b^{4, 117}_0
c  in DIMACS:
-7901  7902 -7903  464  7904 0
-7901  7902 -7903  464  7905 0
-7901  7902 -7903  464 -7906 0

c  -2-1 --> break 
c    ( b^{4, 116}_2 ∧  b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨  b^{4, 116}_0 ∨  p_464 ∨ break
c  in DIMACS:
-7901 -7902  7903  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 116}_2 ∧ -b^{4, 116}_1 ∧ -b^{4, 116}_0 ∧ true) 
c  in CNF:
c    -b^{4, 116}_2 ∨  b^{4, 116}_1 ∨  b^{4, 116}_0 ∨ false 
c  in DIMACS:
-7901  7902  7903  0

c  3 does not represent an automaton state.
c    -(-b^{4, 116}_2 ∧  b^{4, 116}_1 ∧  b^{4, 116}_0 ∧ true) 
c  in CNF:
c     b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ false 
c  in DIMACS:
 7901 -7902 -7903  0
c  -3 does not represent an automaton state.
c    -( b^{4, 116}_2 ∧  b^{4, 116}_1 ∧  b^{4, 116}_0 ∧ true) 
c  in CNF:
c    -b^{4, 116}_2 ∨ -b^{4, 116}_1 ∨ -b^{4, 116}_0 ∨ false 
c  in DIMACS:
-7901 -7902 -7903  0

c i = 117
c  -2+1 --> -1
c    ( b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧  p_468) -> ( b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0)
c  in CNF:
c    -b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨  b^{4, 118}_2
c    -b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_1
c    -b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨  b^{4, 118}_0
c  in DIMACS:
-7904 -7905  7906 -468  7907 0
-7904 -7905  7906 -468 -7908 0
-7904 -7905  7906 -468  7909 0

c  -1+1 --> 0
c    ( b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0 ∧  p_468) -> (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧ -b^{4, 118}_0)
c  in CNF:
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_2
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_1
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_0
c  in DIMACS:
-7904  7905 -7906 -468 -7907 0
-7904  7905 -7906 -468 -7908 0
-7904  7905 -7906 -468 -7909 0

c  0+1 --> 1
c    (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧  p_468) -> (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0)
c  in CNF:
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_2
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_1
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨  b^{4, 118}_0
c  in DIMACS:
 7904  7905  7906 -468 -7907 0
 7904  7905  7906 -468 -7908 0
 7904  7905  7906 -468  7909 0

c  1+1 --> 2
c    (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0 ∧  p_468) -> (-b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0)
c  in CNF:
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_2
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨  b^{4, 118}_1
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ -p_468 ∨ -b^{4, 118}_0
c  in DIMACS:
 7904  7905 -7906 -468 -7907 0
 7904  7905 -7906 -468  7908 0
 7904  7905 -7906 -468 -7909 0

c  2+1 --> break 
c    (-b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧  p_468) -> break
c  in CNF:
c     b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 7904 -7905  7906 -468 1162 0


c  2-1 --> 1
c    (-b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧ -p_468) -> (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0)
c  in CNF:
c     b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_2
c     b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_1
c     b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨  b^{4, 118}_0
c  in DIMACS:
 7904 -7905  7906  468 -7907 0
 7904 -7905  7906  468 -7908 0
 7904 -7905  7906  468  7909 0

c  1-1 --> 0
c    (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0 ∧ -p_468) -> (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧ -b^{4, 118}_0)
c  in CNF:
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_2
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_1
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_0
c  in DIMACS:
 7904  7905 -7906  468 -7907 0
 7904  7905 -7906  468 -7908 0
 7904  7905 -7906  468 -7909 0

c  0-1 --> -1
c    (-b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧ -p_468) -> ( b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0)
c  in CNF:
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨  b^{4, 118}_2
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_1
c     b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨  b^{4, 118}_0
c  in DIMACS:
 7904  7905  7906  468  7907 0
 7904  7905  7906  468 -7908 0
 7904  7905  7906  468  7909 0

c  -1-1 --> -2
c    ( b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧  b^{4, 117}_0 ∧ -p_468) -> ( b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0)
c  in CNF:
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨  b^{4, 118}_2
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨  b^{4, 118}_1
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨  p_468 ∨ -b^{4, 118}_0
c  in DIMACS:
-7904  7905 -7906  468  7907 0
-7904  7905 -7906  468  7908 0
-7904  7905 -7906  468 -7909 0

c  -2-1 --> break 
c    ( b^{4, 117}_2 ∧  b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨  b^{4, 117}_0 ∨  p_468 ∨ break
c  in DIMACS:
-7904 -7905  7906  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 117}_2 ∧ -b^{4, 117}_1 ∧ -b^{4, 117}_0 ∧ true) 
c  in CNF:
c    -b^{4, 117}_2 ∨  b^{4, 117}_1 ∨  b^{4, 117}_0 ∨ false 
c  in DIMACS:
-7904  7905  7906  0

c  3 does not represent an automaton state.
c    -(-b^{4, 117}_2 ∧  b^{4, 117}_1 ∧  b^{4, 117}_0 ∧ true) 
c  in CNF:
c     b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ false 
c  in DIMACS:
 7904 -7905 -7906  0
c  -3 does not represent an automaton state.
c    -( b^{4, 117}_2 ∧  b^{4, 117}_1 ∧  b^{4, 117}_0 ∧ true) 
c  in CNF:
c    -b^{4, 117}_2 ∨ -b^{4, 117}_1 ∨ -b^{4, 117}_0 ∨ false 
c  in DIMACS:
-7904 -7905 -7906  0

c i = 118
c  -2+1 --> -1
c    ( b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧  p_472) -> ( b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0)
c  in CNF:
c    -b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨  b^{4, 119}_2
c    -b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_1
c    -b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨  b^{4, 119}_0
c  in DIMACS:
-7907 -7908  7909 -472  7910 0
-7907 -7908  7909 -472 -7911 0
-7907 -7908  7909 -472  7912 0

c  -1+1 --> 0
c    ( b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0 ∧  p_472) -> (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧ -b^{4, 119}_0)
c  in CNF:
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_2
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_1
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_0
c  in DIMACS:
-7907  7908 -7909 -472 -7910 0
-7907  7908 -7909 -472 -7911 0
-7907  7908 -7909 -472 -7912 0

c  0+1 --> 1
c    (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧  p_472) -> (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0)
c  in CNF:
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_2
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_1
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨  b^{4, 119}_0
c  in DIMACS:
 7907  7908  7909 -472 -7910 0
 7907  7908  7909 -472 -7911 0
 7907  7908  7909 -472  7912 0

c  1+1 --> 2
c    (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0 ∧  p_472) -> (-b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0)
c  in CNF:
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_2
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨  b^{4, 119}_1
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ -p_472 ∨ -b^{4, 119}_0
c  in DIMACS:
 7907  7908 -7909 -472 -7910 0
 7907  7908 -7909 -472  7911 0
 7907  7908 -7909 -472 -7912 0

c  2+1 --> break 
c    (-b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧  p_472) -> break
c  in CNF:
c     b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 7907 -7908  7909 -472 1162 0


c  2-1 --> 1
c    (-b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧ -p_472) -> (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0)
c  in CNF:
c     b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_2
c     b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_1
c     b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨  b^{4, 119}_0
c  in DIMACS:
 7907 -7908  7909  472 -7910 0
 7907 -7908  7909  472 -7911 0
 7907 -7908  7909  472  7912 0

c  1-1 --> 0
c    (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0 ∧ -p_472) -> (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧ -b^{4, 119}_0)
c  in CNF:
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_2
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_1
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_0
c  in DIMACS:
 7907  7908 -7909  472 -7910 0
 7907  7908 -7909  472 -7911 0
 7907  7908 -7909  472 -7912 0

c  0-1 --> -1
c    (-b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧ -p_472) -> ( b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0)
c  in CNF:
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨  b^{4, 119}_2
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_1
c     b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨  b^{4, 119}_0
c  in DIMACS:
 7907  7908  7909  472  7910 0
 7907  7908  7909  472 -7911 0
 7907  7908  7909  472  7912 0

c  -1-1 --> -2
c    ( b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧  b^{4, 118}_0 ∧ -p_472) -> ( b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0)
c  in CNF:
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨  b^{4, 119}_2
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨  b^{4, 119}_1
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨  p_472 ∨ -b^{4, 119}_0
c  in DIMACS:
-7907  7908 -7909  472  7910 0
-7907  7908 -7909  472  7911 0
-7907  7908 -7909  472 -7912 0

c  -2-1 --> break 
c    ( b^{4, 118}_2 ∧  b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨  b^{4, 118}_0 ∨  p_472 ∨ break
c  in DIMACS:
-7907 -7908  7909  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 118}_2 ∧ -b^{4, 118}_1 ∧ -b^{4, 118}_0 ∧ true) 
c  in CNF:
c    -b^{4, 118}_2 ∨  b^{4, 118}_1 ∨  b^{4, 118}_0 ∨ false 
c  in DIMACS:
-7907  7908  7909  0

c  3 does not represent an automaton state.
c    -(-b^{4, 118}_2 ∧  b^{4, 118}_1 ∧  b^{4, 118}_0 ∧ true) 
c  in CNF:
c     b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ false 
c  in DIMACS:
 7907 -7908 -7909  0
c  -3 does not represent an automaton state.
c    -( b^{4, 118}_2 ∧  b^{4, 118}_1 ∧  b^{4, 118}_0 ∧ true) 
c  in CNF:
c    -b^{4, 118}_2 ∨ -b^{4, 118}_1 ∨ -b^{4, 118}_0 ∨ false 
c  in DIMACS:
-7907 -7908 -7909  0

c i = 119
c  -2+1 --> -1
c    ( b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧  p_476) -> ( b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0)
c  in CNF:
c    -b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨  b^{4, 120}_2
c    -b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_1
c    -b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨  b^{4, 120}_0
c  in DIMACS:
-7910 -7911  7912 -476  7913 0
-7910 -7911  7912 -476 -7914 0
-7910 -7911  7912 -476  7915 0

c  -1+1 --> 0
c    ( b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0 ∧  p_476) -> (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧ -b^{4, 120}_0)
c  in CNF:
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_2
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_1
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_0
c  in DIMACS:
-7910  7911 -7912 -476 -7913 0
-7910  7911 -7912 -476 -7914 0
-7910  7911 -7912 -476 -7915 0

c  0+1 --> 1
c    (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧  p_476) -> (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0)
c  in CNF:
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_2
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_1
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨  b^{4, 120}_0
c  in DIMACS:
 7910  7911  7912 -476 -7913 0
 7910  7911  7912 -476 -7914 0
 7910  7911  7912 -476  7915 0

c  1+1 --> 2
c    (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0 ∧  p_476) -> (-b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0)
c  in CNF:
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_2
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨  b^{4, 120}_1
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ -p_476 ∨ -b^{4, 120}_0
c  in DIMACS:
 7910  7911 -7912 -476 -7913 0
 7910  7911 -7912 -476  7914 0
 7910  7911 -7912 -476 -7915 0

c  2+1 --> break 
c    (-b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧  p_476) -> break
c  in CNF:
c     b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 7910 -7911  7912 -476 1162 0


c  2-1 --> 1
c    (-b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧ -p_476) -> (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0)
c  in CNF:
c     b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_2
c     b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_1
c     b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨  b^{4, 120}_0
c  in DIMACS:
 7910 -7911  7912  476 -7913 0
 7910 -7911  7912  476 -7914 0
 7910 -7911  7912  476  7915 0

c  1-1 --> 0
c    (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0 ∧ -p_476) -> (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧ -b^{4, 120}_0)
c  in CNF:
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_2
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_1
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_0
c  in DIMACS:
 7910  7911 -7912  476 -7913 0
 7910  7911 -7912  476 -7914 0
 7910  7911 -7912  476 -7915 0

c  0-1 --> -1
c    (-b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧ -p_476) -> ( b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0)
c  in CNF:
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨  b^{4, 120}_2
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_1
c     b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨  b^{4, 120}_0
c  in DIMACS:
 7910  7911  7912  476  7913 0
 7910  7911  7912  476 -7914 0
 7910  7911  7912  476  7915 0

c  -1-1 --> -2
c    ( b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧  b^{4, 119}_0 ∧ -p_476) -> ( b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0)
c  in CNF:
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨  b^{4, 120}_2
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨  b^{4, 120}_1
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨  p_476 ∨ -b^{4, 120}_0
c  in DIMACS:
-7910  7911 -7912  476  7913 0
-7910  7911 -7912  476  7914 0
-7910  7911 -7912  476 -7915 0

c  -2-1 --> break 
c    ( b^{4, 119}_2 ∧  b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨  b^{4, 119}_0 ∨  p_476 ∨ break
c  in DIMACS:
-7910 -7911  7912  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 119}_2 ∧ -b^{4, 119}_1 ∧ -b^{4, 119}_0 ∧ true) 
c  in CNF:
c    -b^{4, 119}_2 ∨  b^{4, 119}_1 ∨  b^{4, 119}_0 ∨ false 
c  in DIMACS:
-7910  7911  7912  0

c  3 does not represent an automaton state.
c    -(-b^{4, 119}_2 ∧  b^{4, 119}_1 ∧  b^{4, 119}_0 ∧ true) 
c  in CNF:
c     b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ false 
c  in DIMACS:
 7910 -7911 -7912  0
c  -3 does not represent an automaton state.
c    -( b^{4, 119}_2 ∧  b^{4, 119}_1 ∧  b^{4, 119}_0 ∧ true) 
c  in CNF:
c    -b^{4, 119}_2 ∨ -b^{4, 119}_1 ∨ -b^{4, 119}_0 ∨ false 
c  in DIMACS:
-7910 -7911 -7912  0

c i = 120
c  -2+1 --> -1
c    ( b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧  p_480) -> ( b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0)
c  in CNF:
c    -b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨  b^{4, 121}_2
c    -b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_1
c    -b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨  b^{4, 121}_0
c  in DIMACS:
-7913 -7914  7915 -480  7916 0
-7913 -7914  7915 -480 -7917 0
-7913 -7914  7915 -480  7918 0

c  -1+1 --> 0
c    ( b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0 ∧  p_480) -> (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧ -b^{4, 121}_0)
c  in CNF:
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_2
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_1
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_0
c  in DIMACS:
-7913  7914 -7915 -480 -7916 0
-7913  7914 -7915 -480 -7917 0
-7913  7914 -7915 -480 -7918 0

c  0+1 --> 1
c    (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧  p_480) -> (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0)
c  in CNF:
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_2
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_1
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨  b^{4, 121}_0
c  in DIMACS:
 7913  7914  7915 -480 -7916 0
 7913  7914  7915 -480 -7917 0
 7913  7914  7915 -480  7918 0

c  1+1 --> 2
c    (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0 ∧  p_480) -> (-b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0)
c  in CNF:
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_2
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨  b^{4, 121}_1
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ -p_480 ∨ -b^{4, 121}_0
c  in DIMACS:
 7913  7914 -7915 -480 -7916 0
 7913  7914 -7915 -480  7917 0
 7913  7914 -7915 -480 -7918 0

c  2+1 --> break 
c    (-b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧  p_480) -> break
c  in CNF:
c     b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 7913 -7914  7915 -480 1162 0


c  2-1 --> 1
c    (-b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧ -p_480) -> (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0)
c  in CNF:
c     b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_2
c     b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_1
c     b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨  b^{4, 121}_0
c  in DIMACS:
 7913 -7914  7915  480 -7916 0
 7913 -7914  7915  480 -7917 0
 7913 -7914  7915  480  7918 0

c  1-1 --> 0
c    (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0 ∧ -p_480) -> (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧ -b^{4, 121}_0)
c  in CNF:
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_2
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_1
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_0
c  in DIMACS:
 7913  7914 -7915  480 -7916 0
 7913  7914 -7915  480 -7917 0
 7913  7914 -7915  480 -7918 0

c  0-1 --> -1
c    (-b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧ -p_480) -> ( b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0)
c  in CNF:
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨  b^{4, 121}_2
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_1
c     b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨  b^{4, 121}_0
c  in DIMACS:
 7913  7914  7915  480  7916 0
 7913  7914  7915  480 -7917 0
 7913  7914  7915  480  7918 0

c  -1-1 --> -2
c    ( b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧  b^{4, 120}_0 ∧ -p_480) -> ( b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0)
c  in CNF:
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨  b^{4, 121}_2
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨  b^{4, 121}_1
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨  p_480 ∨ -b^{4, 121}_0
c  in DIMACS:
-7913  7914 -7915  480  7916 0
-7913  7914 -7915  480  7917 0
-7913  7914 -7915  480 -7918 0

c  -2-1 --> break 
c    ( b^{4, 120}_2 ∧  b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨  b^{4, 120}_0 ∨  p_480 ∨ break
c  in DIMACS:
-7913 -7914  7915  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 120}_2 ∧ -b^{4, 120}_1 ∧ -b^{4, 120}_0 ∧ true) 
c  in CNF:
c    -b^{4, 120}_2 ∨  b^{4, 120}_1 ∨  b^{4, 120}_0 ∨ false 
c  in DIMACS:
-7913  7914  7915  0

c  3 does not represent an automaton state.
c    -(-b^{4, 120}_2 ∧  b^{4, 120}_1 ∧  b^{4, 120}_0 ∧ true) 
c  in CNF:
c     b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ false 
c  in DIMACS:
 7913 -7914 -7915  0
c  -3 does not represent an automaton state.
c    -( b^{4, 120}_2 ∧  b^{4, 120}_1 ∧  b^{4, 120}_0 ∧ true) 
c  in CNF:
c    -b^{4, 120}_2 ∨ -b^{4, 120}_1 ∨ -b^{4, 120}_0 ∨ false 
c  in DIMACS:
-7913 -7914 -7915  0

c i = 121
c  -2+1 --> -1
c    ( b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧  p_484) -> ( b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0)
c  in CNF:
c    -b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨  b^{4, 122}_2
c    -b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_1
c    -b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨  b^{4, 122}_0
c  in DIMACS:
-7916 -7917  7918 -484  7919 0
-7916 -7917  7918 -484 -7920 0
-7916 -7917  7918 -484  7921 0

c  -1+1 --> 0
c    ( b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0 ∧  p_484) -> (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧ -b^{4, 122}_0)
c  in CNF:
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_2
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_1
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_0
c  in DIMACS:
-7916  7917 -7918 -484 -7919 0
-7916  7917 -7918 -484 -7920 0
-7916  7917 -7918 -484 -7921 0

c  0+1 --> 1
c    (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧  p_484) -> (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0)
c  in CNF:
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_2
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_1
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨  b^{4, 122}_0
c  in DIMACS:
 7916  7917  7918 -484 -7919 0
 7916  7917  7918 -484 -7920 0
 7916  7917  7918 -484  7921 0

c  1+1 --> 2
c    (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0 ∧  p_484) -> (-b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0)
c  in CNF:
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_2
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨  b^{4, 122}_1
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ -p_484 ∨ -b^{4, 122}_0
c  in DIMACS:
 7916  7917 -7918 -484 -7919 0
 7916  7917 -7918 -484  7920 0
 7916  7917 -7918 -484 -7921 0

c  2+1 --> break 
c    (-b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧  p_484) -> break
c  in CNF:
c     b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 7916 -7917  7918 -484 1162 0


c  2-1 --> 1
c    (-b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧ -p_484) -> (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0)
c  in CNF:
c     b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_2
c     b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_1
c     b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨  b^{4, 122}_0
c  in DIMACS:
 7916 -7917  7918  484 -7919 0
 7916 -7917  7918  484 -7920 0
 7916 -7917  7918  484  7921 0

c  1-1 --> 0
c    (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0 ∧ -p_484) -> (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧ -b^{4, 122}_0)
c  in CNF:
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_2
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_1
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_0
c  in DIMACS:
 7916  7917 -7918  484 -7919 0
 7916  7917 -7918  484 -7920 0
 7916  7917 -7918  484 -7921 0

c  0-1 --> -1
c    (-b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧ -p_484) -> ( b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0)
c  in CNF:
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨  b^{4, 122}_2
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_1
c     b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨  b^{4, 122}_0
c  in DIMACS:
 7916  7917  7918  484  7919 0
 7916  7917  7918  484 -7920 0
 7916  7917  7918  484  7921 0

c  -1-1 --> -2
c    ( b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧  b^{4, 121}_0 ∧ -p_484) -> ( b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0)
c  in CNF:
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨  b^{4, 122}_2
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨  b^{4, 122}_1
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨  p_484 ∨ -b^{4, 122}_0
c  in DIMACS:
-7916  7917 -7918  484  7919 0
-7916  7917 -7918  484  7920 0
-7916  7917 -7918  484 -7921 0

c  -2-1 --> break 
c    ( b^{4, 121}_2 ∧  b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨  b^{4, 121}_0 ∨  p_484 ∨ break
c  in DIMACS:
-7916 -7917  7918  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 121}_2 ∧ -b^{4, 121}_1 ∧ -b^{4, 121}_0 ∧ true) 
c  in CNF:
c    -b^{4, 121}_2 ∨  b^{4, 121}_1 ∨  b^{4, 121}_0 ∨ false 
c  in DIMACS:
-7916  7917  7918  0

c  3 does not represent an automaton state.
c    -(-b^{4, 121}_2 ∧  b^{4, 121}_1 ∧  b^{4, 121}_0 ∧ true) 
c  in CNF:
c     b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ false 
c  in DIMACS:
 7916 -7917 -7918  0
c  -3 does not represent an automaton state.
c    -( b^{4, 121}_2 ∧  b^{4, 121}_1 ∧  b^{4, 121}_0 ∧ true) 
c  in CNF:
c    -b^{4, 121}_2 ∨ -b^{4, 121}_1 ∨ -b^{4, 121}_0 ∨ false 
c  in DIMACS:
-7916 -7917 -7918  0

c i = 122
c  -2+1 --> -1
c    ( b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧  p_488) -> ( b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0)
c  in CNF:
c    -b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨  b^{4, 123}_2
c    -b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_1
c    -b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨  b^{4, 123}_0
c  in DIMACS:
-7919 -7920  7921 -488  7922 0
-7919 -7920  7921 -488 -7923 0
-7919 -7920  7921 -488  7924 0

c  -1+1 --> 0
c    ( b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0 ∧  p_488) -> (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧ -b^{4, 123}_0)
c  in CNF:
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_2
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_1
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_0
c  in DIMACS:
-7919  7920 -7921 -488 -7922 0
-7919  7920 -7921 -488 -7923 0
-7919  7920 -7921 -488 -7924 0

c  0+1 --> 1
c    (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧  p_488) -> (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0)
c  in CNF:
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_2
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_1
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨  b^{4, 123}_0
c  in DIMACS:
 7919  7920  7921 -488 -7922 0
 7919  7920  7921 -488 -7923 0
 7919  7920  7921 -488  7924 0

c  1+1 --> 2
c    (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0 ∧  p_488) -> (-b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0)
c  in CNF:
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_2
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨  b^{4, 123}_1
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ -p_488 ∨ -b^{4, 123}_0
c  in DIMACS:
 7919  7920 -7921 -488 -7922 0
 7919  7920 -7921 -488  7923 0
 7919  7920 -7921 -488 -7924 0

c  2+1 --> break 
c    (-b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧  p_488) -> break
c  in CNF:
c     b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 7919 -7920  7921 -488 1162 0


c  2-1 --> 1
c    (-b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧ -p_488) -> (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0)
c  in CNF:
c     b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_2
c     b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_1
c     b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨  b^{4, 123}_0
c  in DIMACS:
 7919 -7920  7921  488 -7922 0
 7919 -7920  7921  488 -7923 0
 7919 -7920  7921  488  7924 0

c  1-1 --> 0
c    (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0 ∧ -p_488) -> (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧ -b^{4, 123}_0)
c  in CNF:
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_2
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_1
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_0
c  in DIMACS:
 7919  7920 -7921  488 -7922 0
 7919  7920 -7921  488 -7923 0
 7919  7920 -7921  488 -7924 0

c  0-1 --> -1
c    (-b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧ -p_488) -> ( b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0)
c  in CNF:
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨  b^{4, 123}_2
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_1
c     b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨  b^{4, 123}_0
c  in DIMACS:
 7919  7920  7921  488  7922 0
 7919  7920  7921  488 -7923 0
 7919  7920  7921  488  7924 0

c  -1-1 --> -2
c    ( b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧  b^{4, 122}_0 ∧ -p_488) -> ( b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0)
c  in CNF:
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨  b^{4, 123}_2
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨  b^{4, 123}_1
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨  p_488 ∨ -b^{4, 123}_0
c  in DIMACS:
-7919  7920 -7921  488  7922 0
-7919  7920 -7921  488  7923 0
-7919  7920 -7921  488 -7924 0

c  -2-1 --> break 
c    ( b^{4, 122}_2 ∧  b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨  b^{4, 122}_0 ∨  p_488 ∨ break
c  in DIMACS:
-7919 -7920  7921  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 122}_2 ∧ -b^{4, 122}_1 ∧ -b^{4, 122}_0 ∧ true) 
c  in CNF:
c    -b^{4, 122}_2 ∨  b^{4, 122}_1 ∨  b^{4, 122}_0 ∨ false 
c  in DIMACS:
-7919  7920  7921  0

c  3 does not represent an automaton state.
c    -(-b^{4, 122}_2 ∧  b^{4, 122}_1 ∧  b^{4, 122}_0 ∧ true) 
c  in CNF:
c     b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ false 
c  in DIMACS:
 7919 -7920 -7921  0
c  -3 does not represent an automaton state.
c    -( b^{4, 122}_2 ∧  b^{4, 122}_1 ∧  b^{4, 122}_0 ∧ true) 
c  in CNF:
c    -b^{4, 122}_2 ∨ -b^{4, 122}_1 ∨ -b^{4, 122}_0 ∨ false 
c  in DIMACS:
-7919 -7920 -7921  0

c i = 123
c  -2+1 --> -1
c    ( b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧  p_492) -> ( b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0)
c  in CNF:
c    -b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨  b^{4, 124}_2
c    -b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_1
c    -b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨  b^{4, 124}_0
c  in DIMACS:
-7922 -7923  7924 -492  7925 0
-7922 -7923  7924 -492 -7926 0
-7922 -7923  7924 -492  7927 0

c  -1+1 --> 0
c    ( b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0 ∧  p_492) -> (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧ -b^{4, 124}_0)
c  in CNF:
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_2
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_1
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_0
c  in DIMACS:
-7922  7923 -7924 -492 -7925 0
-7922  7923 -7924 -492 -7926 0
-7922  7923 -7924 -492 -7927 0

c  0+1 --> 1
c    (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧  p_492) -> (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0)
c  in CNF:
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_2
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_1
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨  b^{4, 124}_0
c  in DIMACS:
 7922  7923  7924 -492 -7925 0
 7922  7923  7924 -492 -7926 0
 7922  7923  7924 -492  7927 0

c  1+1 --> 2
c    (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0 ∧  p_492) -> (-b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0)
c  in CNF:
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_2
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨  b^{4, 124}_1
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ -p_492 ∨ -b^{4, 124}_0
c  in DIMACS:
 7922  7923 -7924 -492 -7925 0
 7922  7923 -7924 -492  7926 0
 7922  7923 -7924 -492 -7927 0

c  2+1 --> break 
c    (-b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧  p_492) -> break
c  in CNF:
c     b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 7922 -7923  7924 -492 1162 0


c  2-1 --> 1
c    (-b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧ -p_492) -> (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0)
c  in CNF:
c     b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_2
c     b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_1
c     b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨  b^{4, 124}_0
c  in DIMACS:
 7922 -7923  7924  492 -7925 0
 7922 -7923  7924  492 -7926 0
 7922 -7923  7924  492  7927 0

c  1-1 --> 0
c    (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0 ∧ -p_492) -> (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧ -b^{4, 124}_0)
c  in CNF:
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_2
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_1
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_0
c  in DIMACS:
 7922  7923 -7924  492 -7925 0
 7922  7923 -7924  492 -7926 0
 7922  7923 -7924  492 -7927 0

c  0-1 --> -1
c    (-b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧ -p_492) -> ( b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0)
c  in CNF:
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨  b^{4, 124}_2
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_1
c     b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨  b^{4, 124}_0
c  in DIMACS:
 7922  7923  7924  492  7925 0
 7922  7923  7924  492 -7926 0
 7922  7923  7924  492  7927 0

c  -1-1 --> -2
c    ( b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧  b^{4, 123}_0 ∧ -p_492) -> ( b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0)
c  in CNF:
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨  b^{4, 124}_2
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨  b^{4, 124}_1
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨  p_492 ∨ -b^{4, 124}_0
c  in DIMACS:
-7922  7923 -7924  492  7925 0
-7922  7923 -7924  492  7926 0
-7922  7923 -7924  492 -7927 0

c  -2-1 --> break 
c    ( b^{4, 123}_2 ∧  b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨  b^{4, 123}_0 ∨  p_492 ∨ break
c  in DIMACS:
-7922 -7923  7924  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 123}_2 ∧ -b^{4, 123}_1 ∧ -b^{4, 123}_0 ∧ true) 
c  in CNF:
c    -b^{4, 123}_2 ∨  b^{4, 123}_1 ∨  b^{4, 123}_0 ∨ false 
c  in DIMACS:
-7922  7923  7924  0

c  3 does not represent an automaton state.
c    -(-b^{4, 123}_2 ∧  b^{4, 123}_1 ∧  b^{4, 123}_0 ∧ true) 
c  in CNF:
c     b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ false 
c  in DIMACS:
 7922 -7923 -7924  0
c  -3 does not represent an automaton state.
c    -( b^{4, 123}_2 ∧  b^{4, 123}_1 ∧  b^{4, 123}_0 ∧ true) 
c  in CNF:
c    -b^{4, 123}_2 ∨ -b^{4, 123}_1 ∨ -b^{4, 123}_0 ∨ false 
c  in DIMACS:
-7922 -7923 -7924  0

c i = 124
c  -2+1 --> -1
c    ( b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧  p_496) -> ( b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0)
c  in CNF:
c    -b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨  b^{4, 125}_2
c    -b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_1
c    -b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨  b^{4, 125}_0
c  in DIMACS:
-7925 -7926  7927 -496  7928 0
-7925 -7926  7927 -496 -7929 0
-7925 -7926  7927 -496  7930 0

c  -1+1 --> 0
c    ( b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0 ∧  p_496) -> (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧ -b^{4, 125}_0)
c  in CNF:
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_2
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_1
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_0
c  in DIMACS:
-7925  7926 -7927 -496 -7928 0
-7925  7926 -7927 -496 -7929 0
-7925  7926 -7927 -496 -7930 0

c  0+1 --> 1
c    (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧  p_496) -> (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0)
c  in CNF:
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_2
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_1
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨  b^{4, 125}_0
c  in DIMACS:
 7925  7926  7927 -496 -7928 0
 7925  7926  7927 -496 -7929 0
 7925  7926  7927 -496  7930 0

c  1+1 --> 2
c    (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0 ∧  p_496) -> (-b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0)
c  in CNF:
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_2
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨  b^{4, 125}_1
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ -p_496 ∨ -b^{4, 125}_0
c  in DIMACS:
 7925  7926 -7927 -496 -7928 0
 7925  7926 -7927 -496  7929 0
 7925  7926 -7927 -496 -7930 0

c  2+1 --> break 
c    (-b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧  p_496) -> break
c  in CNF:
c     b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 7925 -7926  7927 -496 1162 0


c  2-1 --> 1
c    (-b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧ -p_496) -> (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0)
c  in CNF:
c     b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_2
c     b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_1
c     b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨  b^{4, 125}_0
c  in DIMACS:
 7925 -7926  7927  496 -7928 0
 7925 -7926  7927  496 -7929 0
 7925 -7926  7927  496  7930 0

c  1-1 --> 0
c    (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0 ∧ -p_496) -> (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧ -b^{4, 125}_0)
c  in CNF:
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_2
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_1
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_0
c  in DIMACS:
 7925  7926 -7927  496 -7928 0
 7925  7926 -7927  496 -7929 0
 7925  7926 -7927  496 -7930 0

c  0-1 --> -1
c    (-b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧ -p_496) -> ( b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0)
c  in CNF:
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨  b^{4, 125}_2
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_1
c     b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨  b^{4, 125}_0
c  in DIMACS:
 7925  7926  7927  496  7928 0
 7925  7926  7927  496 -7929 0
 7925  7926  7927  496  7930 0

c  -1-1 --> -2
c    ( b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧  b^{4, 124}_0 ∧ -p_496) -> ( b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0)
c  in CNF:
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨  b^{4, 125}_2
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨  b^{4, 125}_1
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨  p_496 ∨ -b^{4, 125}_0
c  in DIMACS:
-7925  7926 -7927  496  7928 0
-7925  7926 -7927  496  7929 0
-7925  7926 -7927  496 -7930 0

c  -2-1 --> break 
c    ( b^{4, 124}_2 ∧  b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨  b^{4, 124}_0 ∨  p_496 ∨ break
c  in DIMACS:
-7925 -7926  7927  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 124}_2 ∧ -b^{4, 124}_1 ∧ -b^{4, 124}_0 ∧ true) 
c  in CNF:
c    -b^{4, 124}_2 ∨  b^{4, 124}_1 ∨  b^{4, 124}_0 ∨ false 
c  in DIMACS:
-7925  7926  7927  0

c  3 does not represent an automaton state.
c    -(-b^{4, 124}_2 ∧  b^{4, 124}_1 ∧  b^{4, 124}_0 ∧ true) 
c  in CNF:
c     b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ false 
c  in DIMACS:
 7925 -7926 -7927  0
c  -3 does not represent an automaton state.
c    -( b^{4, 124}_2 ∧  b^{4, 124}_1 ∧  b^{4, 124}_0 ∧ true) 
c  in CNF:
c    -b^{4, 124}_2 ∨ -b^{4, 124}_1 ∨ -b^{4, 124}_0 ∨ false 
c  in DIMACS:
-7925 -7926 -7927  0

c i = 125
c  -2+1 --> -1
c    ( b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧  p_500) -> ( b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0)
c  in CNF:
c    -b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨  b^{4, 126}_2
c    -b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_1
c    -b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨  b^{4, 126}_0
c  in DIMACS:
-7928 -7929  7930 -500  7931 0
-7928 -7929  7930 -500 -7932 0
-7928 -7929  7930 -500  7933 0

c  -1+1 --> 0
c    ( b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0 ∧  p_500) -> (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧ -b^{4, 126}_0)
c  in CNF:
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_2
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_1
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_0
c  in DIMACS:
-7928  7929 -7930 -500 -7931 0
-7928  7929 -7930 -500 -7932 0
-7928  7929 -7930 -500 -7933 0

c  0+1 --> 1
c    (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧  p_500) -> (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0)
c  in CNF:
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_2
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_1
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨  b^{4, 126}_0
c  in DIMACS:
 7928  7929  7930 -500 -7931 0
 7928  7929  7930 -500 -7932 0
 7928  7929  7930 -500  7933 0

c  1+1 --> 2
c    (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0 ∧  p_500) -> (-b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0)
c  in CNF:
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_2
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨  b^{4, 126}_1
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ -p_500 ∨ -b^{4, 126}_0
c  in DIMACS:
 7928  7929 -7930 -500 -7931 0
 7928  7929 -7930 -500  7932 0
 7928  7929 -7930 -500 -7933 0

c  2+1 --> break 
c    (-b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧  p_500) -> break
c  in CNF:
c     b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 7928 -7929  7930 -500 1162 0


c  2-1 --> 1
c    (-b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧ -p_500) -> (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0)
c  in CNF:
c     b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_2
c     b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_1
c     b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨  b^{4, 126}_0
c  in DIMACS:
 7928 -7929  7930  500 -7931 0
 7928 -7929  7930  500 -7932 0
 7928 -7929  7930  500  7933 0

c  1-1 --> 0
c    (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0 ∧ -p_500) -> (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧ -b^{4, 126}_0)
c  in CNF:
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_2
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_1
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_0
c  in DIMACS:
 7928  7929 -7930  500 -7931 0
 7928  7929 -7930  500 -7932 0
 7928  7929 -7930  500 -7933 0

c  0-1 --> -1
c    (-b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧ -p_500) -> ( b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0)
c  in CNF:
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨  b^{4, 126}_2
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_1
c     b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨  b^{4, 126}_0
c  in DIMACS:
 7928  7929  7930  500  7931 0
 7928  7929  7930  500 -7932 0
 7928  7929  7930  500  7933 0

c  -1-1 --> -2
c    ( b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧  b^{4, 125}_0 ∧ -p_500) -> ( b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0)
c  in CNF:
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨  b^{4, 126}_2
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨  b^{4, 126}_1
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨  p_500 ∨ -b^{4, 126}_0
c  in DIMACS:
-7928  7929 -7930  500  7931 0
-7928  7929 -7930  500  7932 0
-7928  7929 -7930  500 -7933 0

c  -2-1 --> break 
c    ( b^{4, 125}_2 ∧  b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨  b^{4, 125}_0 ∨  p_500 ∨ break
c  in DIMACS:
-7928 -7929  7930  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 125}_2 ∧ -b^{4, 125}_1 ∧ -b^{4, 125}_0 ∧ true) 
c  in CNF:
c    -b^{4, 125}_2 ∨  b^{4, 125}_1 ∨  b^{4, 125}_0 ∨ false 
c  in DIMACS:
-7928  7929  7930  0

c  3 does not represent an automaton state.
c    -(-b^{4, 125}_2 ∧  b^{4, 125}_1 ∧  b^{4, 125}_0 ∧ true) 
c  in CNF:
c     b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ false 
c  in DIMACS:
 7928 -7929 -7930  0
c  -3 does not represent an automaton state.
c    -( b^{4, 125}_2 ∧  b^{4, 125}_1 ∧  b^{4, 125}_0 ∧ true) 
c  in CNF:
c    -b^{4, 125}_2 ∨ -b^{4, 125}_1 ∨ -b^{4, 125}_0 ∨ false 
c  in DIMACS:
-7928 -7929 -7930  0

c i = 126
c  -2+1 --> -1
c    ( b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧  p_504) -> ( b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0)
c  in CNF:
c    -b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨  b^{4, 127}_2
c    -b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_1
c    -b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨  b^{4, 127}_0
c  in DIMACS:
-7931 -7932  7933 -504  7934 0
-7931 -7932  7933 -504 -7935 0
-7931 -7932  7933 -504  7936 0

c  -1+1 --> 0
c    ( b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0 ∧  p_504) -> (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧ -b^{4, 127}_0)
c  in CNF:
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_2
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_1
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_0
c  in DIMACS:
-7931  7932 -7933 -504 -7934 0
-7931  7932 -7933 -504 -7935 0
-7931  7932 -7933 -504 -7936 0

c  0+1 --> 1
c    (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧  p_504) -> (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0)
c  in CNF:
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_2
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_1
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨  b^{4, 127}_0
c  in DIMACS:
 7931  7932  7933 -504 -7934 0
 7931  7932  7933 -504 -7935 0
 7931  7932  7933 -504  7936 0

c  1+1 --> 2
c    (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0 ∧  p_504) -> (-b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0)
c  in CNF:
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_2
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨  b^{4, 127}_1
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ -p_504 ∨ -b^{4, 127}_0
c  in DIMACS:
 7931  7932 -7933 -504 -7934 0
 7931  7932 -7933 -504  7935 0
 7931  7932 -7933 -504 -7936 0

c  2+1 --> break 
c    (-b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧  p_504) -> break
c  in CNF:
c     b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 7931 -7932  7933 -504 1162 0


c  2-1 --> 1
c    (-b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧ -p_504) -> (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0)
c  in CNF:
c     b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_2
c     b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_1
c     b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨  b^{4, 127}_0
c  in DIMACS:
 7931 -7932  7933  504 -7934 0
 7931 -7932  7933  504 -7935 0
 7931 -7932  7933  504  7936 0

c  1-1 --> 0
c    (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0 ∧ -p_504) -> (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧ -b^{4, 127}_0)
c  in CNF:
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_2
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_1
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_0
c  in DIMACS:
 7931  7932 -7933  504 -7934 0
 7931  7932 -7933  504 -7935 0
 7931  7932 -7933  504 -7936 0

c  0-1 --> -1
c    (-b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧ -p_504) -> ( b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0)
c  in CNF:
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨  b^{4, 127}_2
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_1
c     b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨  b^{4, 127}_0
c  in DIMACS:
 7931  7932  7933  504  7934 0
 7931  7932  7933  504 -7935 0
 7931  7932  7933  504  7936 0

c  -1-1 --> -2
c    ( b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧  b^{4, 126}_0 ∧ -p_504) -> ( b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0)
c  in CNF:
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨  b^{4, 127}_2
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨  b^{4, 127}_1
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨  p_504 ∨ -b^{4, 127}_0
c  in DIMACS:
-7931  7932 -7933  504  7934 0
-7931  7932 -7933  504  7935 0
-7931  7932 -7933  504 -7936 0

c  -2-1 --> break 
c    ( b^{4, 126}_2 ∧  b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨  b^{4, 126}_0 ∨  p_504 ∨ break
c  in DIMACS:
-7931 -7932  7933  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 126}_2 ∧ -b^{4, 126}_1 ∧ -b^{4, 126}_0 ∧ true) 
c  in CNF:
c    -b^{4, 126}_2 ∨  b^{4, 126}_1 ∨  b^{4, 126}_0 ∨ false 
c  in DIMACS:
-7931  7932  7933  0

c  3 does not represent an automaton state.
c    -(-b^{4, 126}_2 ∧  b^{4, 126}_1 ∧  b^{4, 126}_0 ∧ true) 
c  in CNF:
c     b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ false 
c  in DIMACS:
 7931 -7932 -7933  0
c  -3 does not represent an automaton state.
c    -( b^{4, 126}_2 ∧  b^{4, 126}_1 ∧  b^{4, 126}_0 ∧ true) 
c  in CNF:
c    -b^{4, 126}_2 ∨ -b^{4, 126}_1 ∨ -b^{4, 126}_0 ∨ false 
c  in DIMACS:
-7931 -7932 -7933  0

c i = 127
c  -2+1 --> -1
c    ( b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧  p_508) -> ( b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0)
c  in CNF:
c    -b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨  b^{4, 128}_2
c    -b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_1
c    -b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨  b^{4, 128}_0
c  in DIMACS:
-7934 -7935  7936 -508  7937 0
-7934 -7935  7936 -508 -7938 0
-7934 -7935  7936 -508  7939 0

c  -1+1 --> 0
c    ( b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0 ∧  p_508) -> (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧ -b^{4, 128}_0)
c  in CNF:
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_2
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_1
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_0
c  in DIMACS:
-7934  7935 -7936 -508 -7937 0
-7934  7935 -7936 -508 -7938 0
-7934  7935 -7936 -508 -7939 0

c  0+1 --> 1
c    (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧  p_508) -> (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0)
c  in CNF:
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_2
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_1
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨  b^{4, 128}_0
c  in DIMACS:
 7934  7935  7936 -508 -7937 0
 7934  7935  7936 -508 -7938 0
 7934  7935  7936 -508  7939 0

c  1+1 --> 2
c    (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0 ∧  p_508) -> (-b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0)
c  in CNF:
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_2
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨  b^{4, 128}_1
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ -p_508 ∨ -b^{4, 128}_0
c  in DIMACS:
 7934  7935 -7936 -508 -7937 0
 7934  7935 -7936 -508  7938 0
 7934  7935 -7936 -508 -7939 0

c  2+1 --> break 
c    (-b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧  p_508) -> break
c  in CNF:
c     b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ -p_508 ∨ break
c  in DIMACS:
 7934 -7935  7936 -508 1162 0


c  2-1 --> 1
c    (-b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧ -p_508) -> (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0)
c  in CNF:
c     b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_2
c     b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_1
c     b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨  b^{4, 128}_0
c  in DIMACS:
 7934 -7935  7936  508 -7937 0
 7934 -7935  7936  508 -7938 0
 7934 -7935  7936  508  7939 0

c  1-1 --> 0
c    (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0 ∧ -p_508) -> (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧ -b^{4, 128}_0)
c  in CNF:
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_2
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_1
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_0
c  in DIMACS:
 7934  7935 -7936  508 -7937 0
 7934  7935 -7936  508 -7938 0
 7934  7935 -7936  508 -7939 0

c  0-1 --> -1
c    (-b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧ -p_508) -> ( b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0)
c  in CNF:
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨  b^{4, 128}_2
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_1
c     b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨  b^{4, 128}_0
c  in DIMACS:
 7934  7935  7936  508  7937 0
 7934  7935  7936  508 -7938 0
 7934  7935  7936  508  7939 0

c  -1-1 --> -2
c    ( b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧  b^{4, 127}_0 ∧ -p_508) -> ( b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0)
c  in CNF:
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨  b^{4, 128}_2
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨  b^{4, 128}_1
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨  p_508 ∨ -b^{4, 128}_0
c  in DIMACS:
-7934  7935 -7936  508  7937 0
-7934  7935 -7936  508  7938 0
-7934  7935 -7936  508 -7939 0

c  -2-1 --> break 
c    ( b^{4, 127}_2 ∧  b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧ -p_508) -> break
c  in CNF:
c    -b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨  b^{4, 127}_0 ∨  p_508 ∨ break
c  in DIMACS:
-7934 -7935  7936  508 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 127}_2 ∧ -b^{4, 127}_1 ∧ -b^{4, 127}_0 ∧ true) 
c  in CNF:
c    -b^{4, 127}_2 ∨  b^{4, 127}_1 ∨  b^{4, 127}_0 ∨ false 
c  in DIMACS:
-7934  7935  7936  0

c  3 does not represent an automaton state.
c    -(-b^{4, 127}_2 ∧  b^{4, 127}_1 ∧  b^{4, 127}_0 ∧ true) 
c  in CNF:
c     b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ false 
c  in DIMACS:
 7934 -7935 -7936  0
c  -3 does not represent an automaton state.
c    -( b^{4, 127}_2 ∧  b^{4, 127}_1 ∧  b^{4, 127}_0 ∧ true) 
c  in CNF:
c    -b^{4, 127}_2 ∨ -b^{4, 127}_1 ∨ -b^{4, 127}_0 ∨ false 
c  in DIMACS:
-7934 -7935 -7936  0

c i = 128
c  -2+1 --> -1
c    ( b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧  p_512) -> ( b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0)
c  in CNF:
c    -b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨  b^{4, 129}_2
c    -b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_1
c    -b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨  b^{4, 129}_0
c  in DIMACS:
-7937 -7938  7939 -512  7940 0
-7937 -7938  7939 -512 -7941 0
-7937 -7938  7939 -512  7942 0

c  -1+1 --> 0
c    ( b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0 ∧  p_512) -> (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧ -b^{4, 129}_0)
c  in CNF:
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_2
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_1
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_0
c  in DIMACS:
-7937  7938 -7939 -512 -7940 0
-7937  7938 -7939 -512 -7941 0
-7937  7938 -7939 -512 -7942 0

c  0+1 --> 1
c    (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧  p_512) -> (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0)
c  in CNF:
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_2
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_1
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨  b^{4, 129}_0
c  in DIMACS:
 7937  7938  7939 -512 -7940 0
 7937  7938  7939 -512 -7941 0
 7937  7938  7939 -512  7942 0

c  1+1 --> 2
c    (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0 ∧  p_512) -> (-b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0)
c  in CNF:
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_2
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨  b^{4, 129}_1
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ -p_512 ∨ -b^{4, 129}_0
c  in DIMACS:
 7937  7938 -7939 -512 -7940 0
 7937  7938 -7939 -512  7941 0
 7937  7938 -7939 -512 -7942 0

c  2+1 --> break 
c    (-b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧  p_512) -> break
c  in CNF:
c     b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 7937 -7938  7939 -512 1162 0


c  2-1 --> 1
c    (-b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧ -p_512) -> (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0)
c  in CNF:
c     b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_2
c     b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_1
c     b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨  b^{4, 129}_0
c  in DIMACS:
 7937 -7938  7939  512 -7940 0
 7937 -7938  7939  512 -7941 0
 7937 -7938  7939  512  7942 0

c  1-1 --> 0
c    (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0 ∧ -p_512) -> (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧ -b^{4, 129}_0)
c  in CNF:
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_2
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_1
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_0
c  in DIMACS:
 7937  7938 -7939  512 -7940 0
 7937  7938 -7939  512 -7941 0
 7937  7938 -7939  512 -7942 0

c  0-1 --> -1
c    (-b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧ -p_512) -> ( b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0)
c  in CNF:
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨  b^{4, 129}_2
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_1
c     b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨  b^{4, 129}_0
c  in DIMACS:
 7937  7938  7939  512  7940 0
 7937  7938  7939  512 -7941 0
 7937  7938  7939  512  7942 0

c  -1-1 --> -2
c    ( b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧  b^{4, 128}_0 ∧ -p_512) -> ( b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0)
c  in CNF:
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨  b^{4, 129}_2
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨  b^{4, 129}_1
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨  p_512 ∨ -b^{4, 129}_0
c  in DIMACS:
-7937  7938 -7939  512  7940 0
-7937  7938 -7939  512  7941 0
-7937  7938 -7939  512 -7942 0

c  -2-1 --> break 
c    ( b^{4, 128}_2 ∧  b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨  b^{4, 128}_0 ∨  p_512 ∨ break
c  in DIMACS:
-7937 -7938  7939  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 128}_2 ∧ -b^{4, 128}_1 ∧ -b^{4, 128}_0 ∧ true) 
c  in CNF:
c    -b^{4, 128}_2 ∨  b^{4, 128}_1 ∨  b^{4, 128}_0 ∨ false 
c  in DIMACS:
-7937  7938  7939  0

c  3 does not represent an automaton state.
c    -(-b^{4, 128}_2 ∧  b^{4, 128}_1 ∧  b^{4, 128}_0 ∧ true) 
c  in CNF:
c     b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ false 
c  in DIMACS:
 7937 -7938 -7939  0
c  -3 does not represent an automaton state.
c    -( b^{4, 128}_2 ∧  b^{4, 128}_1 ∧  b^{4, 128}_0 ∧ true) 
c  in CNF:
c    -b^{4, 128}_2 ∨ -b^{4, 128}_1 ∨ -b^{4, 128}_0 ∨ false 
c  in DIMACS:
-7937 -7938 -7939  0

c i = 129
c  -2+1 --> -1
c    ( b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧  p_516) -> ( b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0)
c  in CNF:
c    -b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨  b^{4, 130}_2
c    -b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_1
c    -b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨  b^{4, 130}_0
c  in DIMACS:
-7940 -7941  7942 -516  7943 0
-7940 -7941  7942 -516 -7944 0
-7940 -7941  7942 -516  7945 0

c  -1+1 --> 0
c    ( b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0 ∧  p_516) -> (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧ -b^{4, 130}_0)
c  in CNF:
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_2
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_1
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_0
c  in DIMACS:
-7940  7941 -7942 -516 -7943 0
-7940  7941 -7942 -516 -7944 0
-7940  7941 -7942 -516 -7945 0

c  0+1 --> 1
c    (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧  p_516) -> (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0)
c  in CNF:
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_2
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_1
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨  b^{4, 130}_0
c  in DIMACS:
 7940  7941  7942 -516 -7943 0
 7940  7941  7942 -516 -7944 0
 7940  7941  7942 -516  7945 0

c  1+1 --> 2
c    (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0 ∧  p_516) -> (-b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0)
c  in CNF:
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_2
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨  b^{4, 130}_1
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ -p_516 ∨ -b^{4, 130}_0
c  in DIMACS:
 7940  7941 -7942 -516 -7943 0
 7940  7941 -7942 -516  7944 0
 7940  7941 -7942 -516 -7945 0

c  2+1 --> break 
c    (-b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧  p_516) -> break
c  in CNF:
c     b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 7940 -7941  7942 -516 1162 0


c  2-1 --> 1
c    (-b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧ -p_516) -> (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0)
c  in CNF:
c     b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_2
c     b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_1
c     b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨  b^{4, 130}_0
c  in DIMACS:
 7940 -7941  7942  516 -7943 0
 7940 -7941  7942  516 -7944 0
 7940 -7941  7942  516  7945 0

c  1-1 --> 0
c    (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0 ∧ -p_516) -> (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧ -b^{4, 130}_0)
c  in CNF:
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_2
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_1
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_0
c  in DIMACS:
 7940  7941 -7942  516 -7943 0
 7940  7941 -7942  516 -7944 0
 7940  7941 -7942  516 -7945 0

c  0-1 --> -1
c    (-b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧ -p_516) -> ( b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0)
c  in CNF:
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨  b^{4, 130}_2
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_1
c     b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨  b^{4, 130}_0
c  in DIMACS:
 7940  7941  7942  516  7943 0
 7940  7941  7942  516 -7944 0
 7940  7941  7942  516  7945 0

c  -1-1 --> -2
c    ( b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧  b^{4, 129}_0 ∧ -p_516) -> ( b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0)
c  in CNF:
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨  b^{4, 130}_2
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨  b^{4, 130}_1
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨  p_516 ∨ -b^{4, 130}_0
c  in DIMACS:
-7940  7941 -7942  516  7943 0
-7940  7941 -7942  516  7944 0
-7940  7941 -7942  516 -7945 0

c  -2-1 --> break 
c    ( b^{4, 129}_2 ∧  b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨  b^{4, 129}_0 ∨  p_516 ∨ break
c  in DIMACS:
-7940 -7941  7942  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 129}_2 ∧ -b^{4, 129}_1 ∧ -b^{4, 129}_0 ∧ true) 
c  in CNF:
c    -b^{4, 129}_2 ∨  b^{4, 129}_1 ∨  b^{4, 129}_0 ∨ false 
c  in DIMACS:
-7940  7941  7942  0

c  3 does not represent an automaton state.
c    -(-b^{4, 129}_2 ∧  b^{4, 129}_1 ∧  b^{4, 129}_0 ∧ true) 
c  in CNF:
c     b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ false 
c  in DIMACS:
 7940 -7941 -7942  0
c  -3 does not represent an automaton state.
c    -( b^{4, 129}_2 ∧  b^{4, 129}_1 ∧  b^{4, 129}_0 ∧ true) 
c  in CNF:
c    -b^{4, 129}_2 ∨ -b^{4, 129}_1 ∨ -b^{4, 129}_0 ∨ false 
c  in DIMACS:
-7940 -7941 -7942  0

c i = 130
c  -2+1 --> -1
c    ( b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧  p_520) -> ( b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0)
c  in CNF:
c    -b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨  b^{4, 131}_2
c    -b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_1
c    -b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨  b^{4, 131}_0
c  in DIMACS:
-7943 -7944  7945 -520  7946 0
-7943 -7944  7945 -520 -7947 0
-7943 -7944  7945 -520  7948 0

c  -1+1 --> 0
c    ( b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0 ∧  p_520) -> (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧ -b^{4, 131}_0)
c  in CNF:
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_2
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_1
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_0
c  in DIMACS:
-7943  7944 -7945 -520 -7946 0
-7943  7944 -7945 -520 -7947 0
-7943  7944 -7945 -520 -7948 0

c  0+1 --> 1
c    (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧  p_520) -> (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0)
c  in CNF:
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_2
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_1
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨  b^{4, 131}_0
c  in DIMACS:
 7943  7944  7945 -520 -7946 0
 7943  7944  7945 -520 -7947 0
 7943  7944  7945 -520  7948 0

c  1+1 --> 2
c    (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0 ∧  p_520) -> (-b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0)
c  in CNF:
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_2
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨  b^{4, 131}_1
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ -p_520 ∨ -b^{4, 131}_0
c  in DIMACS:
 7943  7944 -7945 -520 -7946 0
 7943  7944 -7945 -520  7947 0
 7943  7944 -7945 -520 -7948 0

c  2+1 --> break 
c    (-b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧  p_520) -> break
c  in CNF:
c     b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 7943 -7944  7945 -520 1162 0


c  2-1 --> 1
c    (-b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧ -p_520) -> (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0)
c  in CNF:
c     b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_2
c     b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_1
c     b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨  b^{4, 131}_0
c  in DIMACS:
 7943 -7944  7945  520 -7946 0
 7943 -7944  7945  520 -7947 0
 7943 -7944  7945  520  7948 0

c  1-1 --> 0
c    (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0 ∧ -p_520) -> (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧ -b^{4, 131}_0)
c  in CNF:
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_2
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_1
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_0
c  in DIMACS:
 7943  7944 -7945  520 -7946 0
 7943  7944 -7945  520 -7947 0
 7943  7944 -7945  520 -7948 0

c  0-1 --> -1
c    (-b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧ -p_520) -> ( b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0)
c  in CNF:
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨  b^{4, 131}_2
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_1
c     b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨  b^{4, 131}_0
c  in DIMACS:
 7943  7944  7945  520  7946 0
 7943  7944  7945  520 -7947 0
 7943  7944  7945  520  7948 0

c  -1-1 --> -2
c    ( b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧  b^{4, 130}_0 ∧ -p_520) -> ( b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0)
c  in CNF:
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨  b^{4, 131}_2
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨  b^{4, 131}_1
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨  p_520 ∨ -b^{4, 131}_0
c  in DIMACS:
-7943  7944 -7945  520  7946 0
-7943  7944 -7945  520  7947 0
-7943  7944 -7945  520 -7948 0

c  -2-1 --> break 
c    ( b^{4, 130}_2 ∧  b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨  b^{4, 130}_0 ∨  p_520 ∨ break
c  in DIMACS:
-7943 -7944  7945  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 130}_2 ∧ -b^{4, 130}_1 ∧ -b^{4, 130}_0 ∧ true) 
c  in CNF:
c    -b^{4, 130}_2 ∨  b^{4, 130}_1 ∨  b^{4, 130}_0 ∨ false 
c  in DIMACS:
-7943  7944  7945  0

c  3 does not represent an automaton state.
c    -(-b^{4, 130}_2 ∧  b^{4, 130}_1 ∧  b^{4, 130}_0 ∧ true) 
c  in CNF:
c     b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ false 
c  in DIMACS:
 7943 -7944 -7945  0
c  -3 does not represent an automaton state.
c    -( b^{4, 130}_2 ∧  b^{4, 130}_1 ∧  b^{4, 130}_0 ∧ true) 
c  in CNF:
c    -b^{4, 130}_2 ∨ -b^{4, 130}_1 ∨ -b^{4, 130}_0 ∨ false 
c  in DIMACS:
-7943 -7944 -7945  0

c i = 131
c  -2+1 --> -1
c    ( b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧  p_524) -> ( b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0)
c  in CNF:
c    -b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨  b^{4, 132}_2
c    -b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_1
c    -b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨  b^{4, 132}_0
c  in DIMACS:
-7946 -7947  7948 -524  7949 0
-7946 -7947  7948 -524 -7950 0
-7946 -7947  7948 -524  7951 0

c  -1+1 --> 0
c    ( b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0 ∧  p_524) -> (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧ -b^{4, 132}_0)
c  in CNF:
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_2
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_1
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_0
c  in DIMACS:
-7946  7947 -7948 -524 -7949 0
-7946  7947 -7948 -524 -7950 0
-7946  7947 -7948 -524 -7951 0

c  0+1 --> 1
c    (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧  p_524) -> (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0)
c  in CNF:
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_2
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_1
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨  b^{4, 132}_0
c  in DIMACS:
 7946  7947  7948 -524 -7949 0
 7946  7947  7948 -524 -7950 0
 7946  7947  7948 -524  7951 0

c  1+1 --> 2
c    (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0 ∧  p_524) -> (-b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0)
c  in CNF:
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_2
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨  b^{4, 132}_1
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ -p_524 ∨ -b^{4, 132}_0
c  in DIMACS:
 7946  7947 -7948 -524 -7949 0
 7946  7947 -7948 -524  7950 0
 7946  7947 -7948 -524 -7951 0

c  2+1 --> break 
c    (-b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧  p_524) -> break
c  in CNF:
c     b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ -p_524 ∨ break
c  in DIMACS:
 7946 -7947  7948 -524 1162 0


c  2-1 --> 1
c    (-b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧ -p_524) -> (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0)
c  in CNF:
c     b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_2
c     b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_1
c     b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨  b^{4, 132}_0
c  in DIMACS:
 7946 -7947  7948  524 -7949 0
 7946 -7947  7948  524 -7950 0
 7946 -7947  7948  524  7951 0

c  1-1 --> 0
c    (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0 ∧ -p_524) -> (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧ -b^{4, 132}_0)
c  in CNF:
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_2
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_1
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_0
c  in DIMACS:
 7946  7947 -7948  524 -7949 0
 7946  7947 -7948  524 -7950 0
 7946  7947 -7948  524 -7951 0

c  0-1 --> -1
c    (-b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧ -p_524) -> ( b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0)
c  in CNF:
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨  b^{4, 132}_2
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_1
c     b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨  b^{4, 132}_0
c  in DIMACS:
 7946  7947  7948  524  7949 0
 7946  7947  7948  524 -7950 0
 7946  7947  7948  524  7951 0

c  -1-1 --> -2
c    ( b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧  b^{4, 131}_0 ∧ -p_524) -> ( b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0)
c  in CNF:
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨  b^{4, 132}_2
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨  b^{4, 132}_1
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨  p_524 ∨ -b^{4, 132}_0
c  in DIMACS:
-7946  7947 -7948  524  7949 0
-7946  7947 -7948  524  7950 0
-7946  7947 -7948  524 -7951 0

c  -2-1 --> break 
c    ( b^{4, 131}_2 ∧  b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧ -p_524) -> break
c  in CNF:
c    -b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨  b^{4, 131}_0 ∨  p_524 ∨ break
c  in DIMACS:
-7946 -7947  7948  524 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 131}_2 ∧ -b^{4, 131}_1 ∧ -b^{4, 131}_0 ∧ true) 
c  in CNF:
c    -b^{4, 131}_2 ∨  b^{4, 131}_1 ∨  b^{4, 131}_0 ∨ false 
c  in DIMACS:
-7946  7947  7948  0

c  3 does not represent an automaton state.
c    -(-b^{4, 131}_2 ∧  b^{4, 131}_1 ∧  b^{4, 131}_0 ∧ true) 
c  in CNF:
c     b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ false 
c  in DIMACS:
 7946 -7947 -7948  0
c  -3 does not represent an automaton state.
c    -( b^{4, 131}_2 ∧  b^{4, 131}_1 ∧  b^{4, 131}_0 ∧ true) 
c  in CNF:
c    -b^{4, 131}_2 ∨ -b^{4, 131}_1 ∨ -b^{4, 131}_0 ∨ false 
c  in DIMACS:
-7946 -7947 -7948  0

c i = 132
c  -2+1 --> -1
c    ( b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧  p_528) -> ( b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0)
c  in CNF:
c    -b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨  b^{4, 133}_2
c    -b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_1
c    -b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨  b^{4, 133}_0
c  in DIMACS:
-7949 -7950  7951 -528  7952 0
-7949 -7950  7951 -528 -7953 0
-7949 -7950  7951 -528  7954 0

c  -1+1 --> 0
c    ( b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0 ∧  p_528) -> (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧ -b^{4, 133}_0)
c  in CNF:
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_2
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_1
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_0
c  in DIMACS:
-7949  7950 -7951 -528 -7952 0
-7949  7950 -7951 -528 -7953 0
-7949  7950 -7951 -528 -7954 0

c  0+1 --> 1
c    (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧  p_528) -> (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0)
c  in CNF:
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_2
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_1
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨  b^{4, 133}_0
c  in DIMACS:
 7949  7950  7951 -528 -7952 0
 7949  7950  7951 -528 -7953 0
 7949  7950  7951 -528  7954 0

c  1+1 --> 2
c    (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0 ∧  p_528) -> (-b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0)
c  in CNF:
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_2
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨  b^{4, 133}_1
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ -p_528 ∨ -b^{4, 133}_0
c  in DIMACS:
 7949  7950 -7951 -528 -7952 0
 7949  7950 -7951 -528  7953 0
 7949  7950 -7951 -528 -7954 0

c  2+1 --> break 
c    (-b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧  p_528) -> break
c  in CNF:
c     b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 7949 -7950  7951 -528 1162 0


c  2-1 --> 1
c    (-b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧ -p_528) -> (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0)
c  in CNF:
c     b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_2
c     b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_1
c     b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨  b^{4, 133}_0
c  in DIMACS:
 7949 -7950  7951  528 -7952 0
 7949 -7950  7951  528 -7953 0
 7949 -7950  7951  528  7954 0

c  1-1 --> 0
c    (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0 ∧ -p_528) -> (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧ -b^{4, 133}_0)
c  in CNF:
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_2
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_1
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_0
c  in DIMACS:
 7949  7950 -7951  528 -7952 0
 7949  7950 -7951  528 -7953 0
 7949  7950 -7951  528 -7954 0

c  0-1 --> -1
c    (-b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧ -p_528) -> ( b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0)
c  in CNF:
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨  b^{4, 133}_2
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_1
c     b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨  b^{4, 133}_0
c  in DIMACS:
 7949  7950  7951  528  7952 0
 7949  7950  7951  528 -7953 0
 7949  7950  7951  528  7954 0

c  -1-1 --> -2
c    ( b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧  b^{4, 132}_0 ∧ -p_528) -> ( b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0)
c  in CNF:
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨  b^{4, 133}_2
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨  b^{4, 133}_1
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨  p_528 ∨ -b^{4, 133}_0
c  in DIMACS:
-7949  7950 -7951  528  7952 0
-7949  7950 -7951  528  7953 0
-7949  7950 -7951  528 -7954 0

c  -2-1 --> break 
c    ( b^{4, 132}_2 ∧  b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨  b^{4, 132}_0 ∨  p_528 ∨ break
c  in DIMACS:
-7949 -7950  7951  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 132}_2 ∧ -b^{4, 132}_1 ∧ -b^{4, 132}_0 ∧ true) 
c  in CNF:
c    -b^{4, 132}_2 ∨  b^{4, 132}_1 ∨  b^{4, 132}_0 ∨ false 
c  in DIMACS:
-7949  7950  7951  0

c  3 does not represent an automaton state.
c    -(-b^{4, 132}_2 ∧  b^{4, 132}_1 ∧  b^{4, 132}_0 ∧ true) 
c  in CNF:
c     b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ false 
c  in DIMACS:
 7949 -7950 -7951  0
c  -3 does not represent an automaton state.
c    -( b^{4, 132}_2 ∧  b^{4, 132}_1 ∧  b^{4, 132}_0 ∧ true) 
c  in CNF:
c    -b^{4, 132}_2 ∨ -b^{4, 132}_1 ∨ -b^{4, 132}_0 ∨ false 
c  in DIMACS:
-7949 -7950 -7951  0

c i = 133
c  -2+1 --> -1
c    ( b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧  p_532) -> ( b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0)
c  in CNF:
c    -b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨  b^{4, 134}_2
c    -b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_1
c    -b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨  b^{4, 134}_0
c  in DIMACS:
-7952 -7953  7954 -532  7955 0
-7952 -7953  7954 -532 -7956 0
-7952 -7953  7954 -532  7957 0

c  -1+1 --> 0
c    ( b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0 ∧  p_532) -> (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧ -b^{4, 134}_0)
c  in CNF:
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_2
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_1
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_0
c  in DIMACS:
-7952  7953 -7954 -532 -7955 0
-7952  7953 -7954 -532 -7956 0
-7952  7953 -7954 -532 -7957 0

c  0+1 --> 1
c    (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧  p_532) -> (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0)
c  in CNF:
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_2
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_1
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨  b^{4, 134}_0
c  in DIMACS:
 7952  7953  7954 -532 -7955 0
 7952  7953  7954 -532 -7956 0
 7952  7953  7954 -532  7957 0

c  1+1 --> 2
c    (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0 ∧  p_532) -> (-b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0)
c  in CNF:
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_2
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨  b^{4, 134}_1
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ -p_532 ∨ -b^{4, 134}_0
c  in DIMACS:
 7952  7953 -7954 -532 -7955 0
 7952  7953 -7954 -532  7956 0
 7952  7953 -7954 -532 -7957 0

c  2+1 --> break 
c    (-b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧  p_532) -> break
c  in CNF:
c     b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 7952 -7953  7954 -532 1162 0


c  2-1 --> 1
c    (-b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧ -p_532) -> (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0)
c  in CNF:
c     b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_2
c     b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_1
c     b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨  b^{4, 134}_0
c  in DIMACS:
 7952 -7953  7954  532 -7955 0
 7952 -7953  7954  532 -7956 0
 7952 -7953  7954  532  7957 0

c  1-1 --> 0
c    (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0 ∧ -p_532) -> (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧ -b^{4, 134}_0)
c  in CNF:
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_2
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_1
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_0
c  in DIMACS:
 7952  7953 -7954  532 -7955 0
 7952  7953 -7954  532 -7956 0
 7952  7953 -7954  532 -7957 0

c  0-1 --> -1
c    (-b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧ -p_532) -> ( b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0)
c  in CNF:
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨  b^{4, 134}_2
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_1
c     b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨  b^{4, 134}_0
c  in DIMACS:
 7952  7953  7954  532  7955 0
 7952  7953  7954  532 -7956 0
 7952  7953  7954  532  7957 0

c  -1-1 --> -2
c    ( b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧  b^{4, 133}_0 ∧ -p_532) -> ( b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0)
c  in CNF:
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨  b^{4, 134}_2
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨  b^{4, 134}_1
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨  p_532 ∨ -b^{4, 134}_0
c  in DIMACS:
-7952  7953 -7954  532  7955 0
-7952  7953 -7954  532  7956 0
-7952  7953 -7954  532 -7957 0

c  -2-1 --> break 
c    ( b^{4, 133}_2 ∧  b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨  b^{4, 133}_0 ∨  p_532 ∨ break
c  in DIMACS:
-7952 -7953  7954  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 133}_2 ∧ -b^{4, 133}_1 ∧ -b^{4, 133}_0 ∧ true) 
c  in CNF:
c    -b^{4, 133}_2 ∨  b^{4, 133}_1 ∨  b^{4, 133}_0 ∨ false 
c  in DIMACS:
-7952  7953  7954  0

c  3 does not represent an automaton state.
c    -(-b^{4, 133}_2 ∧  b^{4, 133}_1 ∧  b^{4, 133}_0 ∧ true) 
c  in CNF:
c     b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ false 
c  in DIMACS:
 7952 -7953 -7954  0
c  -3 does not represent an automaton state.
c    -( b^{4, 133}_2 ∧  b^{4, 133}_1 ∧  b^{4, 133}_0 ∧ true) 
c  in CNF:
c    -b^{4, 133}_2 ∨ -b^{4, 133}_1 ∨ -b^{4, 133}_0 ∨ false 
c  in DIMACS:
-7952 -7953 -7954  0

c i = 134
c  -2+1 --> -1
c    ( b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧  p_536) -> ( b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0)
c  in CNF:
c    -b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨  b^{4, 135}_2
c    -b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_1
c    -b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨  b^{4, 135}_0
c  in DIMACS:
-7955 -7956  7957 -536  7958 0
-7955 -7956  7957 -536 -7959 0
-7955 -7956  7957 -536  7960 0

c  -1+1 --> 0
c    ( b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0 ∧  p_536) -> (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧ -b^{4, 135}_0)
c  in CNF:
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_2
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_1
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_0
c  in DIMACS:
-7955  7956 -7957 -536 -7958 0
-7955  7956 -7957 -536 -7959 0
-7955  7956 -7957 -536 -7960 0

c  0+1 --> 1
c    (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧  p_536) -> (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0)
c  in CNF:
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_2
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_1
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨  b^{4, 135}_0
c  in DIMACS:
 7955  7956  7957 -536 -7958 0
 7955  7956  7957 -536 -7959 0
 7955  7956  7957 -536  7960 0

c  1+1 --> 2
c    (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0 ∧  p_536) -> (-b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0)
c  in CNF:
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_2
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨  b^{4, 135}_1
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ -p_536 ∨ -b^{4, 135}_0
c  in DIMACS:
 7955  7956 -7957 -536 -7958 0
 7955  7956 -7957 -536  7959 0
 7955  7956 -7957 -536 -7960 0

c  2+1 --> break 
c    (-b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧  p_536) -> break
c  in CNF:
c     b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 7955 -7956  7957 -536 1162 0


c  2-1 --> 1
c    (-b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧ -p_536) -> (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0)
c  in CNF:
c     b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_2
c     b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_1
c     b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨  b^{4, 135}_0
c  in DIMACS:
 7955 -7956  7957  536 -7958 0
 7955 -7956  7957  536 -7959 0
 7955 -7956  7957  536  7960 0

c  1-1 --> 0
c    (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0 ∧ -p_536) -> (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧ -b^{4, 135}_0)
c  in CNF:
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_2
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_1
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_0
c  in DIMACS:
 7955  7956 -7957  536 -7958 0
 7955  7956 -7957  536 -7959 0
 7955  7956 -7957  536 -7960 0

c  0-1 --> -1
c    (-b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧ -p_536) -> ( b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0)
c  in CNF:
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨  b^{4, 135}_2
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_1
c     b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨  b^{4, 135}_0
c  in DIMACS:
 7955  7956  7957  536  7958 0
 7955  7956  7957  536 -7959 0
 7955  7956  7957  536  7960 0

c  -1-1 --> -2
c    ( b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧  b^{4, 134}_0 ∧ -p_536) -> ( b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0)
c  in CNF:
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨  b^{4, 135}_2
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨  b^{4, 135}_1
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨  p_536 ∨ -b^{4, 135}_0
c  in DIMACS:
-7955  7956 -7957  536  7958 0
-7955  7956 -7957  536  7959 0
-7955  7956 -7957  536 -7960 0

c  -2-1 --> break 
c    ( b^{4, 134}_2 ∧  b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨  b^{4, 134}_0 ∨  p_536 ∨ break
c  in DIMACS:
-7955 -7956  7957  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 134}_2 ∧ -b^{4, 134}_1 ∧ -b^{4, 134}_0 ∧ true) 
c  in CNF:
c    -b^{4, 134}_2 ∨  b^{4, 134}_1 ∨  b^{4, 134}_0 ∨ false 
c  in DIMACS:
-7955  7956  7957  0

c  3 does not represent an automaton state.
c    -(-b^{4, 134}_2 ∧  b^{4, 134}_1 ∧  b^{4, 134}_0 ∧ true) 
c  in CNF:
c     b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ false 
c  in DIMACS:
 7955 -7956 -7957  0
c  -3 does not represent an automaton state.
c    -( b^{4, 134}_2 ∧  b^{4, 134}_1 ∧  b^{4, 134}_0 ∧ true) 
c  in CNF:
c    -b^{4, 134}_2 ∨ -b^{4, 134}_1 ∨ -b^{4, 134}_0 ∨ false 
c  in DIMACS:
-7955 -7956 -7957  0

c i = 135
c  -2+1 --> -1
c    ( b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧  p_540) -> ( b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0)
c  in CNF:
c    -b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨  b^{4, 136}_2
c    -b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_1
c    -b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨  b^{4, 136}_0
c  in DIMACS:
-7958 -7959  7960 -540  7961 0
-7958 -7959  7960 -540 -7962 0
-7958 -7959  7960 -540  7963 0

c  -1+1 --> 0
c    ( b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0 ∧  p_540) -> (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧ -b^{4, 136}_0)
c  in CNF:
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_2
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_1
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_0
c  in DIMACS:
-7958  7959 -7960 -540 -7961 0
-7958  7959 -7960 -540 -7962 0
-7958  7959 -7960 -540 -7963 0

c  0+1 --> 1
c    (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧  p_540) -> (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0)
c  in CNF:
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_2
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_1
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨  b^{4, 136}_0
c  in DIMACS:
 7958  7959  7960 -540 -7961 0
 7958  7959  7960 -540 -7962 0
 7958  7959  7960 -540  7963 0

c  1+1 --> 2
c    (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0 ∧  p_540) -> (-b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0)
c  in CNF:
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_2
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨  b^{4, 136}_1
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ -p_540 ∨ -b^{4, 136}_0
c  in DIMACS:
 7958  7959 -7960 -540 -7961 0
 7958  7959 -7960 -540  7962 0
 7958  7959 -7960 -540 -7963 0

c  2+1 --> break 
c    (-b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧  p_540) -> break
c  in CNF:
c     b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 7958 -7959  7960 -540 1162 0


c  2-1 --> 1
c    (-b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧ -p_540) -> (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0)
c  in CNF:
c     b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_2
c     b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_1
c     b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨  b^{4, 136}_0
c  in DIMACS:
 7958 -7959  7960  540 -7961 0
 7958 -7959  7960  540 -7962 0
 7958 -7959  7960  540  7963 0

c  1-1 --> 0
c    (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0 ∧ -p_540) -> (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧ -b^{4, 136}_0)
c  in CNF:
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_2
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_1
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_0
c  in DIMACS:
 7958  7959 -7960  540 -7961 0
 7958  7959 -7960  540 -7962 0
 7958  7959 -7960  540 -7963 0

c  0-1 --> -1
c    (-b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧ -p_540) -> ( b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0)
c  in CNF:
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨  b^{4, 136}_2
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_1
c     b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨  b^{4, 136}_0
c  in DIMACS:
 7958  7959  7960  540  7961 0
 7958  7959  7960  540 -7962 0
 7958  7959  7960  540  7963 0

c  -1-1 --> -2
c    ( b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧  b^{4, 135}_0 ∧ -p_540) -> ( b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0)
c  in CNF:
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨  b^{4, 136}_2
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨  b^{4, 136}_1
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨  p_540 ∨ -b^{4, 136}_0
c  in DIMACS:
-7958  7959 -7960  540  7961 0
-7958  7959 -7960  540  7962 0
-7958  7959 -7960  540 -7963 0

c  -2-1 --> break 
c    ( b^{4, 135}_2 ∧  b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨  b^{4, 135}_0 ∨  p_540 ∨ break
c  in DIMACS:
-7958 -7959  7960  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 135}_2 ∧ -b^{4, 135}_1 ∧ -b^{4, 135}_0 ∧ true) 
c  in CNF:
c    -b^{4, 135}_2 ∨  b^{4, 135}_1 ∨  b^{4, 135}_0 ∨ false 
c  in DIMACS:
-7958  7959  7960  0

c  3 does not represent an automaton state.
c    -(-b^{4, 135}_2 ∧  b^{4, 135}_1 ∧  b^{4, 135}_0 ∧ true) 
c  in CNF:
c     b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ false 
c  in DIMACS:
 7958 -7959 -7960  0
c  -3 does not represent an automaton state.
c    -( b^{4, 135}_2 ∧  b^{4, 135}_1 ∧  b^{4, 135}_0 ∧ true) 
c  in CNF:
c    -b^{4, 135}_2 ∨ -b^{4, 135}_1 ∨ -b^{4, 135}_0 ∨ false 
c  in DIMACS:
-7958 -7959 -7960  0

c i = 136
c  -2+1 --> -1
c    ( b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧  p_544) -> ( b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0)
c  in CNF:
c    -b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨  b^{4, 137}_2
c    -b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_1
c    -b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨  b^{4, 137}_0
c  in DIMACS:
-7961 -7962  7963 -544  7964 0
-7961 -7962  7963 -544 -7965 0
-7961 -7962  7963 -544  7966 0

c  -1+1 --> 0
c    ( b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0 ∧  p_544) -> (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧ -b^{4, 137}_0)
c  in CNF:
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_2
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_1
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_0
c  in DIMACS:
-7961  7962 -7963 -544 -7964 0
-7961  7962 -7963 -544 -7965 0
-7961  7962 -7963 -544 -7966 0

c  0+1 --> 1
c    (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧  p_544) -> (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0)
c  in CNF:
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_2
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_1
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨  b^{4, 137}_0
c  in DIMACS:
 7961  7962  7963 -544 -7964 0
 7961  7962  7963 -544 -7965 0
 7961  7962  7963 -544  7966 0

c  1+1 --> 2
c    (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0 ∧  p_544) -> (-b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0)
c  in CNF:
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_2
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨  b^{4, 137}_1
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ -p_544 ∨ -b^{4, 137}_0
c  in DIMACS:
 7961  7962 -7963 -544 -7964 0
 7961  7962 -7963 -544  7965 0
 7961  7962 -7963 -544 -7966 0

c  2+1 --> break 
c    (-b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧  p_544) -> break
c  in CNF:
c     b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 7961 -7962  7963 -544 1162 0


c  2-1 --> 1
c    (-b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧ -p_544) -> (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0)
c  in CNF:
c     b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_2
c     b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_1
c     b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨  b^{4, 137}_0
c  in DIMACS:
 7961 -7962  7963  544 -7964 0
 7961 -7962  7963  544 -7965 0
 7961 -7962  7963  544  7966 0

c  1-1 --> 0
c    (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0 ∧ -p_544) -> (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧ -b^{4, 137}_0)
c  in CNF:
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_2
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_1
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_0
c  in DIMACS:
 7961  7962 -7963  544 -7964 0
 7961  7962 -7963  544 -7965 0
 7961  7962 -7963  544 -7966 0

c  0-1 --> -1
c    (-b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧ -p_544) -> ( b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0)
c  in CNF:
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨  b^{4, 137}_2
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_1
c     b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨  b^{4, 137}_0
c  in DIMACS:
 7961  7962  7963  544  7964 0
 7961  7962  7963  544 -7965 0
 7961  7962  7963  544  7966 0

c  -1-1 --> -2
c    ( b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧  b^{4, 136}_0 ∧ -p_544) -> ( b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0)
c  in CNF:
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨  b^{4, 137}_2
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨  b^{4, 137}_1
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨  p_544 ∨ -b^{4, 137}_0
c  in DIMACS:
-7961  7962 -7963  544  7964 0
-7961  7962 -7963  544  7965 0
-7961  7962 -7963  544 -7966 0

c  -2-1 --> break 
c    ( b^{4, 136}_2 ∧  b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨  b^{4, 136}_0 ∨  p_544 ∨ break
c  in DIMACS:
-7961 -7962  7963  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 136}_2 ∧ -b^{4, 136}_1 ∧ -b^{4, 136}_0 ∧ true) 
c  in CNF:
c    -b^{4, 136}_2 ∨  b^{4, 136}_1 ∨  b^{4, 136}_0 ∨ false 
c  in DIMACS:
-7961  7962  7963  0

c  3 does not represent an automaton state.
c    -(-b^{4, 136}_2 ∧  b^{4, 136}_1 ∧  b^{4, 136}_0 ∧ true) 
c  in CNF:
c     b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ false 
c  in DIMACS:
 7961 -7962 -7963  0
c  -3 does not represent an automaton state.
c    -( b^{4, 136}_2 ∧  b^{4, 136}_1 ∧  b^{4, 136}_0 ∧ true) 
c  in CNF:
c    -b^{4, 136}_2 ∨ -b^{4, 136}_1 ∨ -b^{4, 136}_0 ∨ false 
c  in DIMACS:
-7961 -7962 -7963  0

c i = 137
c  -2+1 --> -1
c    ( b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧  p_548) -> ( b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0)
c  in CNF:
c    -b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨  b^{4, 138}_2
c    -b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_1
c    -b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨  b^{4, 138}_0
c  in DIMACS:
-7964 -7965  7966 -548  7967 0
-7964 -7965  7966 -548 -7968 0
-7964 -7965  7966 -548  7969 0

c  -1+1 --> 0
c    ( b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0 ∧  p_548) -> (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧ -b^{4, 138}_0)
c  in CNF:
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_2
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_1
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_0
c  in DIMACS:
-7964  7965 -7966 -548 -7967 0
-7964  7965 -7966 -548 -7968 0
-7964  7965 -7966 -548 -7969 0

c  0+1 --> 1
c    (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧  p_548) -> (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0)
c  in CNF:
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_2
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_1
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨  b^{4, 138}_0
c  in DIMACS:
 7964  7965  7966 -548 -7967 0
 7964  7965  7966 -548 -7968 0
 7964  7965  7966 -548  7969 0

c  1+1 --> 2
c    (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0 ∧  p_548) -> (-b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0)
c  in CNF:
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_2
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨  b^{4, 138}_1
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ -p_548 ∨ -b^{4, 138}_0
c  in DIMACS:
 7964  7965 -7966 -548 -7967 0
 7964  7965 -7966 -548  7968 0
 7964  7965 -7966 -548 -7969 0

c  2+1 --> break 
c    (-b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧  p_548) -> break
c  in CNF:
c     b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ -p_548 ∨ break
c  in DIMACS:
 7964 -7965  7966 -548 1162 0


c  2-1 --> 1
c    (-b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧ -p_548) -> (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0)
c  in CNF:
c     b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_2
c     b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_1
c     b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨  b^{4, 138}_0
c  in DIMACS:
 7964 -7965  7966  548 -7967 0
 7964 -7965  7966  548 -7968 0
 7964 -7965  7966  548  7969 0

c  1-1 --> 0
c    (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0 ∧ -p_548) -> (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧ -b^{4, 138}_0)
c  in CNF:
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_2
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_1
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_0
c  in DIMACS:
 7964  7965 -7966  548 -7967 0
 7964  7965 -7966  548 -7968 0
 7964  7965 -7966  548 -7969 0

c  0-1 --> -1
c    (-b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧ -p_548) -> ( b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0)
c  in CNF:
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨  b^{4, 138}_2
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_1
c     b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨  b^{4, 138}_0
c  in DIMACS:
 7964  7965  7966  548  7967 0
 7964  7965  7966  548 -7968 0
 7964  7965  7966  548  7969 0

c  -1-1 --> -2
c    ( b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧  b^{4, 137}_0 ∧ -p_548) -> ( b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0)
c  in CNF:
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨  b^{4, 138}_2
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨  b^{4, 138}_1
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨  p_548 ∨ -b^{4, 138}_0
c  in DIMACS:
-7964  7965 -7966  548  7967 0
-7964  7965 -7966  548  7968 0
-7964  7965 -7966  548 -7969 0

c  -2-1 --> break 
c    ( b^{4, 137}_2 ∧  b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧ -p_548) -> break
c  in CNF:
c    -b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨  b^{4, 137}_0 ∨  p_548 ∨ break
c  in DIMACS:
-7964 -7965  7966  548 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 137}_2 ∧ -b^{4, 137}_1 ∧ -b^{4, 137}_0 ∧ true) 
c  in CNF:
c    -b^{4, 137}_2 ∨  b^{4, 137}_1 ∨  b^{4, 137}_0 ∨ false 
c  in DIMACS:
-7964  7965  7966  0

c  3 does not represent an automaton state.
c    -(-b^{4, 137}_2 ∧  b^{4, 137}_1 ∧  b^{4, 137}_0 ∧ true) 
c  in CNF:
c     b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ false 
c  in DIMACS:
 7964 -7965 -7966  0
c  -3 does not represent an automaton state.
c    -( b^{4, 137}_2 ∧  b^{4, 137}_1 ∧  b^{4, 137}_0 ∧ true) 
c  in CNF:
c    -b^{4, 137}_2 ∨ -b^{4, 137}_1 ∨ -b^{4, 137}_0 ∨ false 
c  in DIMACS:
-7964 -7965 -7966  0

c i = 138
c  -2+1 --> -1
c    ( b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧  p_552) -> ( b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0)
c  in CNF:
c    -b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨  b^{4, 139}_2
c    -b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_1
c    -b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨  b^{4, 139}_0
c  in DIMACS:
-7967 -7968  7969 -552  7970 0
-7967 -7968  7969 -552 -7971 0
-7967 -7968  7969 -552  7972 0

c  -1+1 --> 0
c    ( b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0 ∧  p_552) -> (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧ -b^{4, 139}_0)
c  in CNF:
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_2
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_1
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_0
c  in DIMACS:
-7967  7968 -7969 -552 -7970 0
-7967  7968 -7969 -552 -7971 0
-7967  7968 -7969 -552 -7972 0

c  0+1 --> 1
c    (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧  p_552) -> (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0)
c  in CNF:
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_2
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_1
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨  b^{4, 139}_0
c  in DIMACS:
 7967  7968  7969 -552 -7970 0
 7967  7968  7969 -552 -7971 0
 7967  7968  7969 -552  7972 0

c  1+1 --> 2
c    (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0 ∧  p_552) -> (-b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0)
c  in CNF:
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_2
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨  b^{4, 139}_1
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ -p_552 ∨ -b^{4, 139}_0
c  in DIMACS:
 7967  7968 -7969 -552 -7970 0
 7967  7968 -7969 -552  7971 0
 7967  7968 -7969 -552 -7972 0

c  2+1 --> break 
c    (-b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧  p_552) -> break
c  in CNF:
c     b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 7967 -7968  7969 -552 1162 0


c  2-1 --> 1
c    (-b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧ -p_552) -> (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0)
c  in CNF:
c     b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_2
c     b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_1
c     b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨  b^{4, 139}_0
c  in DIMACS:
 7967 -7968  7969  552 -7970 0
 7967 -7968  7969  552 -7971 0
 7967 -7968  7969  552  7972 0

c  1-1 --> 0
c    (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0 ∧ -p_552) -> (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧ -b^{4, 139}_0)
c  in CNF:
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_2
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_1
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_0
c  in DIMACS:
 7967  7968 -7969  552 -7970 0
 7967  7968 -7969  552 -7971 0
 7967  7968 -7969  552 -7972 0

c  0-1 --> -1
c    (-b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧ -p_552) -> ( b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0)
c  in CNF:
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨  b^{4, 139}_2
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_1
c     b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨  b^{4, 139}_0
c  in DIMACS:
 7967  7968  7969  552  7970 0
 7967  7968  7969  552 -7971 0
 7967  7968  7969  552  7972 0

c  -1-1 --> -2
c    ( b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧  b^{4, 138}_0 ∧ -p_552) -> ( b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0)
c  in CNF:
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨  b^{4, 139}_2
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨  b^{4, 139}_1
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨  p_552 ∨ -b^{4, 139}_0
c  in DIMACS:
-7967  7968 -7969  552  7970 0
-7967  7968 -7969  552  7971 0
-7967  7968 -7969  552 -7972 0

c  -2-1 --> break 
c    ( b^{4, 138}_2 ∧  b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨  b^{4, 138}_0 ∨  p_552 ∨ break
c  in DIMACS:
-7967 -7968  7969  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 138}_2 ∧ -b^{4, 138}_1 ∧ -b^{4, 138}_0 ∧ true) 
c  in CNF:
c    -b^{4, 138}_2 ∨  b^{4, 138}_1 ∨  b^{4, 138}_0 ∨ false 
c  in DIMACS:
-7967  7968  7969  0

c  3 does not represent an automaton state.
c    -(-b^{4, 138}_2 ∧  b^{4, 138}_1 ∧  b^{4, 138}_0 ∧ true) 
c  in CNF:
c     b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ false 
c  in DIMACS:
 7967 -7968 -7969  0
c  -3 does not represent an automaton state.
c    -( b^{4, 138}_2 ∧  b^{4, 138}_1 ∧  b^{4, 138}_0 ∧ true) 
c  in CNF:
c    -b^{4, 138}_2 ∨ -b^{4, 138}_1 ∨ -b^{4, 138}_0 ∨ false 
c  in DIMACS:
-7967 -7968 -7969  0

c i = 139
c  -2+1 --> -1
c    ( b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧  p_556) -> ( b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0)
c  in CNF:
c    -b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨  b^{4, 140}_2
c    -b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_1
c    -b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨  b^{4, 140}_0
c  in DIMACS:
-7970 -7971  7972 -556  7973 0
-7970 -7971  7972 -556 -7974 0
-7970 -7971  7972 -556  7975 0

c  -1+1 --> 0
c    ( b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0 ∧  p_556) -> (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧ -b^{4, 140}_0)
c  in CNF:
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_2
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_1
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_0
c  in DIMACS:
-7970  7971 -7972 -556 -7973 0
-7970  7971 -7972 -556 -7974 0
-7970  7971 -7972 -556 -7975 0

c  0+1 --> 1
c    (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧  p_556) -> (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0)
c  in CNF:
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_2
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_1
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨  b^{4, 140}_0
c  in DIMACS:
 7970  7971  7972 -556 -7973 0
 7970  7971  7972 -556 -7974 0
 7970  7971  7972 -556  7975 0

c  1+1 --> 2
c    (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0 ∧  p_556) -> (-b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0)
c  in CNF:
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_2
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨  b^{4, 140}_1
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ -p_556 ∨ -b^{4, 140}_0
c  in DIMACS:
 7970  7971 -7972 -556 -7973 0
 7970  7971 -7972 -556  7974 0
 7970  7971 -7972 -556 -7975 0

c  2+1 --> break 
c    (-b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧  p_556) -> break
c  in CNF:
c     b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ -p_556 ∨ break
c  in DIMACS:
 7970 -7971  7972 -556 1162 0


c  2-1 --> 1
c    (-b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧ -p_556) -> (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0)
c  in CNF:
c     b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_2
c     b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_1
c     b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨  b^{4, 140}_0
c  in DIMACS:
 7970 -7971  7972  556 -7973 0
 7970 -7971  7972  556 -7974 0
 7970 -7971  7972  556  7975 0

c  1-1 --> 0
c    (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0 ∧ -p_556) -> (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧ -b^{4, 140}_0)
c  in CNF:
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_2
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_1
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_0
c  in DIMACS:
 7970  7971 -7972  556 -7973 0
 7970  7971 -7972  556 -7974 0
 7970  7971 -7972  556 -7975 0

c  0-1 --> -1
c    (-b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧ -p_556) -> ( b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0)
c  in CNF:
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨  b^{4, 140}_2
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_1
c     b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨  b^{4, 140}_0
c  in DIMACS:
 7970  7971  7972  556  7973 0
 7970  7971  7972  556 -7974 0
 7970  7971  7972  556  7975 0

c  -1-1 --> -2
c    ( b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧  b^{4, 139}_0 ∧ -p_556) -> ( b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0)
c  in CNF:
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨  b^{4, 140}_2
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨  b^{4, 140}_1
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨  p_556 ∨ -b^{4, 140}_0
c  in DIMACS:
-7970  7971 -7972  556  7973 0
-7970  7971 -7972  556  7974 0
-7970  7971 -7972  556 -7975 0

c  -2-1 --> break 
c    ( b^{4, 139}_2 ∧  b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧ -p_556) -> break
c  in CNF:
c    -b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨  b^{4, 139}_0 ∨  p_556 ∨ break
c  in DIMACS:
-7970 -7971  7972  556 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 139}_2 ∧ -b^{4, 139}_1 ∧ -b^{4, 139}_0 ∧ true) 
c  in CNF:
c    -b^{4, 139}_2 ∨  b^{4, 139}_1 ∨  b^{4, 139}_0 ∨ false 
c  in DIMACS:
-7970  7971  7972  0

c  3 does not represent an automaton state.
c    -(-b^{4, 139}_2 ∧  b^{4, 139}_1 ∧  b^{4, 139}_0 ∧ true) 
c  in CNF:
c     b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ false 
c  in DIMACS:
 7970 -7971 -7972  0
c  -3 does not represent an automaton state.
c    -( b^{4, 139}_2 ∧  b^{4, 139}_1 ∧  b^{4, 139}_0 ∧ true) 
c  in CNF:
c    -b^{4, 139}_2 ∨ -b^{4, 139}_1 ∨ -b^{4, 139}_0 ∨ false 
c  in DIMACS:
-7970 -7971 -7972  0

c i = 140
c  -2+1 --> -1
c    ( b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧  p_560) -> ( b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0)
c  in CNF:
c    -b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨  b^{4, 141}_2
c    -b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_1
c    -b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨  b^{4, 141}_0
c  in DIMACS:
-7973 -7974  7975 -560  7976 0
-7973 -7974  7975 -560 -7977 0
-7973 -7974  7975 -560  7978 0

c  -1+1 --> 0
c    ( b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0 ∧  p_560) -> (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧ -b^{4, 141}_0)
c  in CNF:
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_2
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_1
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_0
c  in DIMACS:
-7973  7974 -7975 -560 -7976 0
-7973  7974 -7975 -560 -7977 0
-7973  7974 -7975 -560 -7978 0

c  0+1 --> 1
c    (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧  p_560) -> (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0)
c  in CNF:
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_2
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_1
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨  b^{4, 141}_0
c  in DIMACS:
 7973  7974  7975 -560 -7976 0
 7973  7974  7975 -560 -7977 0
 7973  7974  7975 -560  7978 0

c  1+1 --> 2
c    (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0 ∧  p_560) -> (-b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0)
c  in CNF:
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_2
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨  b^{4, 141}_1
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ -p_560 ∨ -b^{4, 141}_0
c  in DIMACS:
 7973  7974 -7975 -560 -7976 0
 7973  7974 -7975 -560  7977 0
 7973  7974 -7975 -560 -7978 0

c  2+1 --> break 
c    (-b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧  p_560) -> break
c  in CNF:
c     b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 7973 -7974  7975 -560 1162 0


c  2-1 --> 1
c    (-b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧ -p_560) -> (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0)
c  in CNF:
c     b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_2
c     b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_1
c     b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨  b^{4, 141}_0
c  in DIMACS:
 7973 -7974  7975  560 -7976 0
 7973 -7974  7975  560 -7977 0
 7973 -7974  7975  560  7978 0

c  1-1 --> 0
c    (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0 ∧ -p_560) -> (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧ -b^{4, 141}_0)
c  in CNF:
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_2
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_1
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_0
c  in DIMACS:
 7973  7974 -7975  560 -7976 0
 7973  7974 -7975  560 -7977 0
 7973  7974 -7975  560 -7978 0

c  0-1 --> -1
c    (-b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧ -p_560) -> ( b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0)
c  in CNF:
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨  b^{4, 141}_2
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_1
c     b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨  b^{4, 141}_0
c  in DIMACS:
 7973  7974  7975  560  7976 0
 7973  7974  7975  560 -7977 0
 7973  7974  7975  560  7978 0

c  -1-1 --> -2
c    ( b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧  b^{4, 140}_0 ∧ -p_560) -> ( b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0)
c  in CNF:
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨  b^{4, 141}_2
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨  b^{4, 141}_1
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨  p_560 ∨ -b^{4, 141}_0
c  in DIMACS:
-7973  7974 -7975  560  7976 0
-7973  7974 -7975  560  7977 0
-7973  7974 -7975  560 -7978 0

c  -2-1 --> break 
c    ( b^{4, 140}_2 ∧  b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨  b^{4, 140}_0 ∨  p_560 ∨ break
c  in DIMACS:
-7973 -7974  7975  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 140}_2 ∧ -b^{4, 140}_1 ∧ -b^{4, 140}_0 ∧ true) 
c  in CNF:
c    -b^{4, 140}_2 ∨  b^{4, 140}_1 ∨  b^{4, 140}_0 ∨ false 
c  in DIMACS:
-7973  7974  7975  0

c  3 does not represent an automaton state.
c    -(-b^{4, 140}_2 ∧  b^{4, 140}_1 ∧  b^{4, 140}_0 ∧ true) 
c  in CNF:
c     b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ false 
c  in DIMACS:
 7973 -7974 -7975  0
c  -3 does not represent an automaton state.
c    -( b^{4, 140}_2 ∧  b^{4, 140}_1 ∧  b^{4, 140}_0 ∧ true) 
c  in CNF:
c    -b^{4, 140}_2 ∨ -b^{4, 140}_1 ∨ -b^{4, 140}_0 ∨ false 
c  in DIMACS:
-7973 -7974 -7975  0

c i = 141
c  -2+1 --> -1
c    ( b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧  p_564) -> ( b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0)
c  in CNF:
c    -b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨  b^{4, 142}_2
c    -b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_1
c    -b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨  b^{4, 142}_0
c  in DIMACS:
-7976 -7977  7978 -564  7979 0
-7976 -7977  7978 -564 -7980 0
-7976 -7977  7978 -564  7981 0

c  -1+1 --> 0
c    ( b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0 ∧  p_564) -> (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧ -b^{4, 142}_0)
c  in CNF:
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_2
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_1
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_0
c  in DIMACS:
-7976  7977 -7978 -564 -7979 0
-7976  7977 -7978 -564 -7980 0
-7976  7977 -7978 -564 -7981 0

c  0+1 --> 1
c    (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧  p_564) -> (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0)
c  in CNF:
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_2
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_1
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨  b^{4, 142}_0
c  in DIMACS:
 7976  7977  7978 -564 -7979 0
 7976  7977  7978 -564 -7980 0
 7976  7977  7978 -564  7981 0

c  1+1 --> 2
c    (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0 ∧  p_564) -> (-b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0)
c  in CNF:
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_2
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨  b^{4, 142}_1
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ -p_564 ∨ -b^{4, 142}_0
c  in DIMACS:
 7976  7977 -7978 -564 -7979 0
 7976  7977 -7978 -564  7980 0
 7976  7977 -7978 -564 -7981 0

c  2+1 --> break 
c    (-b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧  p_564) -> break
c  in CNF:
c     b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 7976 -7977  7978 -564 1162 0


c  2-1 --> 1
c    (-b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧ -p_564) -> (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0)
c  in CNF:
c     b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_2
c     b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_1
c     b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨  b^{4, 142}_0
c  in DIMACS:
 7976 -7977  7978  564 -7979 0
 7976 -7977  7978  564 -7980 0
 7976 -7977  7978  564  7981 0

c  1-1 --> 0
c    (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0 ∧ -p_564) -> (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧ -b^{4, 142}_0)
c  in CNF:
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_2
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_1
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_0
c  in DIMACS:
 7976  7977 -7978  564 -7979 0
 7976  7977 -7978  564 -7980 0
 7976  7977 -7978  564 -7981 0

c  0-1 --> -1
c    (-b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧ -p_564) -> ( b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0)
c  in CNF:
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨  b^{4, 142}_2
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_1
c     b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨  b^{4, 142}_0
c  in DIMACS:
 7976  7977  7978  564  7979 0
 7976  7977  7978  564 -7980 0
 7976  7977  7978  564  7981 0

c  -1-1 --> -2
c    ( b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧  b^{4, 141}_0 ∧ -p_564) -> ( b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0)
c  in CNF:
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨  b^{4, 142}_2
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨  b^{4, 142}_1
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨  p_564 ∨ -b^{4, 142}_0
c  in DIMACS:
-7976  7977 -7978  564  7979 0
-7976  7977 -7978  564  7980 0
-7976  7977 -7978  564 -7981 0

c  -2-1 --> break 
c    ( b^{4, 141}_2 ∧  b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨  b^{4, 141}_0 ∨  p_564 ∨ break
c  in DIMACS:
-7976 -7977  7978  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 141}_2 ∧ -b^{4, 141}_1 ∧ -b^{4, 141}_0 ∧ true) 
c  in CNF:
c    -b^{4, 141}_2 ∨  b^{4, 141}_1 ∨  b^{4, 141}_0 ∨ false 
c  in DIMACS:
-7976  7977  7978  0

c  3 does not represent an automaton state.
c    -(-b^{4, 141}_2 ∧  b^{4, 141}_1 ∧  b^{4, 141}_0 ∧ true) 
c  in CNF:
c     b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ false 
c  in DIMACS:
 7976 -7977 -7978  0
c  -3 does not represent an automaton state.
c    -( b^{4, 141}_2 ∧  b^{4, 141}_1 ∧  b^{4, 141}_0 ∧ true) 
c  in CNF:
c    -b^{4, 141}_2 ∨ -b^{4, 141}_1 ∨ -b^{4, 141}_0 ∨ false 
c  in DIMACS:
-7976 -7977 -7978  0

c i = 142
c  -2+1 --> -1
c    ( b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧  p_568) -> ( b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0)
c  in CNF:
c    -b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨  b^{4, 143}_2
c    -b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_1
c    -b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨  b^{4, 143}_0
c  in DIMACS:
-7979 -7980  7981 -568  7982 0
-7979 -7980  7981 -568 -7983 0
-7979 -7980  7981 -568  7984 0

c  -1+1 --> 0
c    ( b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0 ∧  p_568) -> (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧ -b^{4, 143}_0)
c  in CNF:
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_2
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_1
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_0
c  in DIMACS:
-7979  7980 -7981 -568 -7982 0
-7979  7980 -7981 -568 -7983 0
-7979  7980 -7981 -568 -7984 0

c  0+1 --> 1
c    (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧  p_568) -> (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0)
c  in CNF:
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_2
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_1
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨  b^{4, 143}_0
c  in DIMACS:
 7979  7980  7981 -568 -7982 0
 7979  7980  7981 -568 -7983 0
 7979  7980  7981 -568  7984 0

c  1+1 --> 2
c    (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0 ∧  p_568) -> (-b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0)
c  in CNF:
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_2
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨  b^{4, 143}_1
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ -p_568 ∨ -b^{4, 143}_0
c  in DIMACS:
 7979  7980 -7981 -568 -7982 0
 7979  7980 -7981 -568  7983 0
 7979  7980 -7981 -568 -7984 0

c  2+1 --> break 
c    (-b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧  p_568) -> break
c  in CNF:
c     b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 7979 -7980  7981 -568 1162 0


c  2-1 --> 1
c    (-b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧ -p_568) -> (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0)
c  in CNF:
c     b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_2
c     b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_1
c     b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨  b^{4, 143}_0
c  in DIMACS:
 7979 -7980  7981  568 -7982 0
 7979 -7980  7981  568 -7983 0
 7979 -7980  7981  568  7984 0

c  1-1 --> 0
c    (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0 ∧ -p_568) -> (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧ -b^{4, 143}_0)
c  in CNF:
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_2
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_1
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_0
c  in DIMACS:
 7979  7980 -7981  568 -7982 0
 7979  7980 -7981  568 -7983 0
 7979  7980 -7981  568 -7984 0

c  0-1 --> -1
c    (-b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧ -p_568) -> ( b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0)
c  in CNF:
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨  b^{4, 143}_2
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_1
c     b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨  b^{4, 143}_0
c  in DIMACS:
 7979  7980  7981  568  7982 0
 7979  7980  7981  568 -7983 0
 7979  7980  7981  568  7984 0

c  -1-1 --> -2
c    ( b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧  b^{4, 142}_0 ∧ -p_568) -> ( b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0)
c  in CNF:
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨  b^{4, 143}_2
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨  b^{4, 143}_1
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨  p_568 ∨ -b^{4, 143}_0
c  in DIMACS:
-7979  7980 -7981  568  7982 0
-7979  7980 -7981  568  7983 0
-7979  7980 -7981  568 -7984 0

c  -2-1 --> break 
c    ( b^{4, 142}_2 ∧  b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨  b^{4, 142}_0 ∨  p_568 ∨ break
c  in DIMACS:
-7979 -7980  7981  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 142}_2 ∧ -b^{4, 142}_1 ∧ -b^{4, 142}_0 ∧ true) 
c  in CNF:
c    -b^{4, 142}_2 ∨  b^{4, 142}_1 ∨  b^{4, 142}_0 ∨ false 
c  in DIMACS:
-7979  7980  7981  0

c  3 does not represent an automaton state.
c    -(-b^{4, 142}_2 ∧  b^{4, 142}_1 ∧  b^{4, 142}_0 ∧ true) 
c  in CNF:
c     b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ false 
c  in DIMACS:
 7979 -7980 -7981  0
c  -3 does not represent an automaton state.
c    -( b^{4, 142}_2 ∧  b^{4, 142}_1 ∧  b^{4, 142}_0 ∧ true) 
c  in CNF:
c    -b^{4, 142}_2 ∨ -b^{4, 142}_1 ∨ -b^{4, 142}_0 ∨ false 
c  in DIMACS:
-7979 -7980 -7981  0

c i = 143
c  -2+1 --> -1
c    ( b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧  p_572) -> ( b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0)
c  in CNF:
c    -b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨  b^{4, 144}_2
c    -b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_1
c    -b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨  b^{4, 144}_0
c  in DIMACS:
-7982 -7983  7984 -572  7985 0
-7982 -7983  7984 -572 -7986 0
-7982 -7983  7984 -572  7987 0

c  -1+1 --> 0
c    ( b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0 ∧  p_572) -> (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧ -b^{4, 144}_0)
c  in CNF:
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_2
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_1
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_0
c  in DIMACS:
-7982  7983 -7984 -572 -7985 0
-7982  7983 -7984 -572 -7986 0
-7982  7983 -7984 -572 -7987 0

c  0+1 --> 1
c    (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧  p_572) -> (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0)
c  in CNF:
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_2
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_1
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨  b^{4, 144}_0
c  in DIMACS:
 7982  7983  7984 -572 -7985 0
 7982  7983  7984 -572 -7986 0
 7982  7983  7984 -572  7987 0

c  1+1 --> 2
c    (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0 ∧  p_572) -> (-b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0)
c  in CNF:
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_2
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨  b^{4, 144}_1
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ -p_572 ∨ -b^{4, 144}_0
c  in DIMACS:
 7982  7983 -7984 -572 -7985 0
 7982  7983 -7984 -572  7986 0
 7982  7983 -7984 -572 -7987 0

c  2+1 --> break 
c    (-b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧  p_572) -> break
c  in CNF:
c     b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 7982 -7983  7984 -572 1162 0


c  2-1 --> 1
c    (-b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧ -p_572) -> (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0)
c  in CNF:
c     b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_2
c     b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_1
c     b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨  b^{4, 144}_0
c  in DIMACS:
 7982 -7983  7984  572 -7985 0
 7982 -7983  7984  572 -7986 0
 7982 -7983  7984  572  7987 0

c  1-1 --> 0
c    (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0 ∧ -p_572) -> (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧ -b^{4, 144}_0)
c  in CNF:
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_2
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_1
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_0
c  in DIMACS:
 7982  7983 -7984  572 -7985 0
 7982  7983 -7984  572 -7986 0
 7982  7983 -7984  572 -7987 0

c  0-1 --> -1
c    (-b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧ -p_572) -> ( b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0)
c  in CNF:
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨  b^{4, 144}_2
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_1
c     b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨  b^{4, 144}_0
c  in DIMACS:
 7982  7983  7984  572  7985 0
 7982  7983  7984  572 -7986 0
 7982  7983  7984  572  7987 0

c  -1-1 --> -2
c    ( b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧  b^{4, 143}_0 ∧ -p_572) -> ( b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0)
c  in CNF:
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨  b^{4, 144}_2
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨  b^{4, 144}_1
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨  p_572 ∨ -b^{4, 144}_0
c  in DIMACS:
-7982  7983 -7984  572  7985 0
-7982  7983 -7984  572  7986 0
-7982  7983 -7984  572 -7987 0

c  -2-1 --> break 
c    ( b^{4, 143}_2 ∧  b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨  b^{4, 143}_0 ∨  p_572 ∨ break
c  in DIMACS:
-7982 -7983  7984  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 143}_2 ∧ -b^{4, 143}_1 ∧ -b^{4, 143}_0 ∧ true) 
c  in CNF:
c    -b^{4, 143}_2 ∨  b^{4, 143}_1 ∨  b^{4, 143}_0 ∨ false 
c  in DIMACS:
-7982  7983  7984  0

c  3 does not represent an automaton state.
c    -(-b^{4, 143}_2 ∧  b^{4, 143}_1 ∧  b^{4, 143}_0 ∧ true) 
c  in CNF:
c     b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ false 
c  in DIMACS:
 7982 -7983 -7984  0
c  -3 does not represent an automaton state.
c    -( b^{4, 143}_2 ∧  b^{4, 143}_1 ∧  b^{4, 143}_0 ∧ true) 
c  in CNF:
c    -b^{4, 143}_2 ∨ -b^{4, 143}_1 ∨ -b^{4, 143}_0 ∨ false 
c  in DIMACS:
-7982 -7983 -7984  0

c i = 144
c  -2+1 --> -1
c    ( b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧  p_576) -> ( b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0)
c  in CNF:
c    -b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨  b^{4, 145}_2
c    -b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_1
c    -b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨  b^{4, 145}_0
c  in DIMACS:
-7985 -7986  7987 -576  7988 0
-7985 -7986  7987 -576 -7989 0
-7985 -7986  7987 -576  7990 0

c  -1+1 --> 0
c    ( b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0 ∧  p_576) -> (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧ -b^{4, 145}_0)
c  in CNF:
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_2
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_1
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_0
c  in DIMACS:
-7985  7986 -7987 -576 -7988 0
-7985  7986 -7987 -576 -7989 0
-7985  7986 -7987 -576 -7990 0

c  0+1 --> 1
c    (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧  p_576) -> (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0)
c  in CNF:
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_2
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_1
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨  b^{4, 145}_0
c  in DIMACS:
 7985  7986  7987 -576 -7988 0
 7985  7986  7987 -576 -7989 0
 7985  7986  7987 -576  7990 0

c  1+1 --> 2
c    (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0 ∧  p_576) -> (-b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0)
c  in CNF:
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_2
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨  b^{4, 145}_1
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ -p_576 ∨ -b^{4, 145}_0
c  in DIMACS:
 7985  7986 -7987 -576 -7988 0
 7985  7986 -7987 -576  7989 0
 7985  7986 -7987 -576 -7990 0

c  2+1 --> break 
c    (-b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧  p_576) -> break
c  in CNF:
c     b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 7985 -7986  7987 -576 1162 0


c  2-1 --> 1
c    (-b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧ -p_576) -> (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0)
c  in CNF:
c     b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_2
c     b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_1
c     b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨  b^{4, 145}_0
c  in DIMACS:
 7985 -7986  7987  576 -7988 0
 7985 -7986  7987  576 -7989 0
 7985 -7986  7987  576  7990 0

c  1-1 --> 0
c    (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0 ∧ -p_576) -> (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧ -b^{4, 145}_0)
c  in CNF:
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_2
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_1
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_0
c  in DIMACS:
 7985  7986 -7987  576 -7988 0
 7985  7986 -7987  576 -7989 0
 7985  7986 -7987  576 -7990 0

c  0-1 --> -1
c    (-b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧ -p_576) -> ( b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0)
c  in CNF:
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨  b^{4, 145}_2
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_1
c     b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨  b^{4, 145}_0
c  in DIMACS:
 7985  7986  7987  576  7988 0
 7985  7986  7987  576 -7989 0
 7985  7986  7987  576  7990 0

c  -1-1 --> -2
c    ( b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧  b^{4, 144}_0 ∧ -p_576) -> ( b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0)
c  in CNF:
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨  b^{4, 145}_2
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨  b^{4, 145}_1
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨  p_576 ∨ -b^{4, 145}_0
c  in DIMACS:
-7985  7986 -7987  576  7988 0
-7985  7986 -7987  576  7989 0
-7985  7986 -7987  576 -7990 0

c  -2-1 --> break 
c    ( b^{4, 144}_2 ∧  b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨  b^{4, 144}_0 ∨  p_576 ∨ break
c  in DIMACS:
-7985 -7986  7987  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 144}_2 ∧ -b^{4, 144}_1 ∧ -b^{4, 144}_0 ∧ true) 
c  in CNF:
c    -b^{4, 144}_2 ∨  b^{4, 144}_1 ∨  b^{4, 144}_0 ∨ false 
c  in DIMACS:
-7985  7986  7987  0

c  3 does not represent an automaton state.
c    -(-b^{4, 144}_2 ∧  b^{4, 144}_1 ∧  b^{4, 144}_0 ∧ true) 
c  in CNF:
c     b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ false 
c  in DIMACS:
 7985 -7986 -7987  0
c  -3 does not represent an automaton state.
c    -( b^{4, 144}_2 ∧  b^{4, 144}_1 ∧  b^{4, 144}_0 ∧ true) 
c  in CNF:
c    -b^{4, 144}_2 ∨ -b^{4, 144}_1 ∨ -b^{4, 144}_0 ∨ false 
c  in DIMACS:
-7985 -7986 -7987  0

c i = 145
c  -2+1 --> -1
c    ( b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧  p_580) -> ( b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0)
c  in CNF:
c    -b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨  b^{4, 146}_2
c    -b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_1
c    -b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨  b^{4, 146}_0
c  in DIMACS:
-7988 -7989  7990 -580  7991 0
-7988 -7989  7990 -580 -7992 0
-7988 -7989  7990 -580  7993 0

c  -1+1 --> 0
c    ( b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0 ∧  p_580) -> (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧ -b^{4, 146}_0)
c  in CNF:
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_2
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_1
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_0
c  in DIMACS:
-7988  7989 -7990 -580 -7991 0
-7988  7989 -7990 -580 -7992 0
-7988  7989 -7990 -580 -7993 0

c  0+1 --> 1
c    (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧  p_580) -> (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0)
c  in CNF:
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_2
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_1
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨  b^{4, 146}_0
c  in DIMACS:
 7988  7989  7990 -580 -7991 0
 7988  7989  7990 -580 -7992 0
 7988  7989  7990 -580  7993 0

c  1+1 --> 2
c    (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0 ∧  p_580) -> (-b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0)
c  in CNF:
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_2
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨  b^{4, 146}_1
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ -p_580 ∨ -b^{4, 146}_0
c  in DIMACS:
 7988  7989 -7990 -580 -7991 0
 7988  7989 -7990 -580  7992 0
 7988  7989 -7990 -580 -7993 0

c  2+1 --> break 
c    (-b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧  p_580) -> break
c  in CNF:
c     b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 7988 -7989  7990 -580 1162 0


c  2-1 --> 1
c    (-b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧ -p_580) -> (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0)
c  in CNF:
c     b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_2
c     b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_1
c     b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨  b^{4, 146}_0
c  in DIMACS:
 7988 -7989  7990  580 -7991 0
 7988 -7989  7990  580 -7992 0
 7988 -7989  7990  580  7993 0

c  1-1 --> 0
c    (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0 ∧ -p_580) -> (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧ -b^{4, 146}_0)
c  in CNF:
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_2
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_1
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_0
c  in DIMACS:
 7988  7989 -7990  580 -7991 0
 7988  7989 -7990  580 -7992 0
 7988  7989 -7990  580 -7993 0

c  0-1 --> -1
c    (-b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧ -p_580) -> ( b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0)
c  in CNF:
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨  b^{4, 146}_2
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_1
c     b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨  b^{4, 146}_0
c  in DIMACS:
 7988  7989  7990  580  7991 0
 7988  7989  7990  580 -7992 0
 7988  7989  7990  580  7993 0

c  -1-1 --> -2
c    ( b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧  b^{4, 145}_0 ∧ -p_580) -> ( b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0)
c  in CNF:
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨  b^{4, 146}_2
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨  b^{4, 146}_1
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨  p_580 ∨ -b^{4, 146}_0
c  in DIMACS:
-7988  7989 -7990  580  7991 0
-7988  7989 -7990  580  7992 0
-7988  7989 -7990  580 -7993 0

c  -2-1 --> break 
c    ( b^{4, 145}_2 ∧  b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨  b^{4, 145}_0 ∨  p_580 ∨ break
c  in DIMACS:
-7988 -7989  7990  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 145}_2 ∧ -b^{4, 145}_1 ∧ -b^{4, 145}_0 ∧ true) 
c  in CNF:
c    -b^{4, 145}_2 ∨  b^{4, 145}_1 ∨  b^{4, 145}_0 ∨ false 
c  in DIMACS:
-7988  7989  7990  0

c  3 does not represent an automaton state.
c    -(-b^{4, 145}_2 ∧  b^{4, 145}_1 ∧  b^{4, 145}_0 ∧ true) 
c  in CNF:
c     b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ false 
c  in DIMACS:
 7988 -7989 -7990  0
c  -3 does not represent an automaton state.
c    -( b^{4, 145}_2 ∧  b^{4, 145}_1 ∧  b^{4, 145}_0 ∧ true) 
c  in CNF:
c    -b^{4, 145}_2 ∨ -b^{4, 145}_1 ∨ -b^{4, 145}_0 ∨ false 
c  in DIMACS:
-7988 -7989 -7990  0

c i = 146
c  -2+1 --> -1
c    ( b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧  p_584) -> ( b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0)
c  in CNF:
c    -b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨  b^{4, 147}_2
c    -b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_1
c    -b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨  b^{4, 147}_0
c  in DIMACS:
-7991 -7992  7993 -584  7994 0
-7991 -7992  7993 -584 -7995 0
-7991 -7992  7993 -584  7996 0

c  -1+1 --> 0
c    ( b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0 ∧  p_584) -> (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧ -b^{4, 147}_0)
c  in CNF:
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_2
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_1
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_0
c  in DIMACS:
-7991  7992 -7993 -584 -7994 0
-7991  7992 -7993 -584 -7995 0
-7991  7992 -7993 -584 -7996 0

c  0+1 --> 1
c    (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧  p_584) -> (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0)
c  in CNF:
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_2
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_1
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨  b^{4, 147}_0
c  in DIMACS:
 7991  7992  7993 -584 -7994 0
 7991  7992  7993 -584 -7995 0
 7991  7992  7993 -584  7996 0

c  1+1 --> 2
c    (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0 ∧  p_584) -> (-b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0)
c  in CNF:
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_2
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨  b^{4, 147}_1
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ -p_584 ∨ -b^{4, 147}_0
c  in DIMACS:
 7991  7992 -7993 -584 -7994 0
 7991  7992 -7993 -584  7995 0
 7991  7992 -7993 -584 -7996 0

c  2+1 --> break 
c    (-b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧  p_584) -> break
c  in CNF:
c     b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 7991 -7992  7993 -584 1162 0


c  2-1 --> 1
c    (-b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧ -p_584) -> (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0)
c  in CNF:
c     b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_2
c     b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_1
c     b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨  b^{4, 147}_0
c  in DIMACS:
 7991 -7992  7993  584 -7994 0
 7991 -7992  7993  584 -7995 0
 7991 -7992  7993  584  7996 0

c  1-1 --> 0
c    (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0 ∧ -p_584) -> (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧ -b^{4, 147}_0)
c  in CNF:
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_2
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_1
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_0
c  in DIMACS:
 7991  7992 -7993  584 -7994 0
 7991  7992 -7993  584 -7995 0
 7991  7992 -7993  584 -7996 0

c  0-1 --> -1
c    (-b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧ -p_584) -> ( b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0)
c  in CNF:
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨  b^{4, 147}_2
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_1
c     b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨  b^{4, 147}_0
c  in DIMACS:
 7991  7992  7993  584  7994 0
 7991  7992  7993  584 -7995 0
 7991  7992  7993  584  7996 0

c  -1-1 --> -2
c    ( b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧  b^{4, 146}_0 ∧ -p_584) -> ( b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0)
c  in CNF:
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨  b^{4, 147}_2
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨  b^{4, 147}_1
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨  p_584 ∨ -b^{4, 147}_0
c  in DIMACS:
-7991  7992 -7993  584  7994 0
-7991  7992 -7993  584  7995 0
-7991  7992 -7993  584 -7996 0

c  -2-1 --> break 
c    ( b^{4, 146}_2 ∧  b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨  b^{4, 146}_0 ∨  p_584 ∨ break
c  in DIMACS:
-7991 -7992  7993  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 146}_2 ∧ -b^{4, 146}_1 ∧ -b^{4, 146}_0 ∧ true) 
c  in CNF:
c    -b^{4, 146}_2 ∨  b^{4, 146}_1 ∨  b^{4, 146}_0 ∨ false 
c  in DIMACS:
-7991  7992  7993  0

c  3 does not represent an automaton state.
c    -(-b^{4, 146}_2 ∧  b^{4, 146}_1 ∧  b^{4, 146}_0 ∧ true) 
c  in CNF:
c     b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ false 
c  in DIMACS:
 7991 -7992 -7993  0
c  -3 does not represent an automaton state.
c    -( b^{4, 146}_2 ∧  b^{4, 146}_1 ∧  b^{4, 146}_0 ∧ true) 
c  in CNF:
c    -b^{4, 146}_2 ∨ -b^{4, 146}_1 ∨ -b^{4, 146}_0 ∨ false 
c  in DIMACS:
-7991 -7992 -7993  0

c i = 147
c  -2+1 --> -1
c    ( b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧  p_588) -> ( b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0)
c  in CNF:
c    -b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨  b^{4, 148}_2
c    -b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_1
c    -b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨  b^{4, 148}_0
c  in DIMACS:
-7994 -7995  7996 -588  7997 0
-7994 -7995  7996 -588 -7998 0
-7994 -7995  7996 -588  7999 0

c  -1+1 --> 0
c    ( b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0 ∧  p_588) -> (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧ -b^{4, 148}_0)
c  in CNF:
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_2
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_1
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_0
c  in DIMACS:
-7994  7995 -7996 -588 -7997 0
-7994  7995 -7996 -588 -7998 0
-7994  7995 -7996 -588 -7999 0

c  0+1 --> 1
c    (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧  p_588) -> (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0)
c  in CNF:
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_2
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_1
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨  b^{4, 148}_0
c  in DIMACS:
 7994  7995  7996 -588 -7997 0
 7994  7995  7996 -588 -7998 0
 7994  7995  7996 -588  7999 0

c  1+1 --> 2
c    (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0 ∧  p_588) -> (-b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0)
c  in CNF:
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_2
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨  b^{4, 148}_1
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ -p_588 ∨ -b^{4, 148}_0
c  in DIMACS:
 7994  7995 -7996 -588 -7997 0
 7994  7995 -7996 -588  7998 0
 7994  7995 -7996 -588 -7999 0

c  2+1 --> break 
c    (-b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧  p_588) -> break
c  in CNF:
c     b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 7994 -7995  7996 -588 1162 0


c  2-1 --> 1
c    (-b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧ -p_588) -> (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0)
c  in CNF:
c     b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_2
c     b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_1
c     b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨  b^{4, 148}_0
c  in DIMACS:
 7994 -7995  7996  588 -7997 0
 7994 -7995  7996  588 -7998 0
 7994 -7995  7996  588  7999 0

c  1-1 --> 0
c    (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0 ∧ -p_588) -> (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧ -b^{4, 148}_0)
c  in CNF:
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_2
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_1
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_0
c  in DIMACS:
 7994  7995 -7996  588 -7997 0
 7994  7995 -7996  588 -7998 0
 7994  7995 -7996  588 -7999 0

c  0-1 --> -1
c    (-b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧ -p_588) -> ( b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0)
c  in CNF:
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨  b^{4, 148}_2
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_1
c     b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨  b^{4, 148}_0
c  in DIMACS:
 7994  7995  7996  588  7997 0
 7994  7995  7996  588 -7998 0
 7994  7995  7996  588  7999 0

c  -1-1 --> -2
c    ( b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧  b^{4, 147}_0 ∧ -p_588) -> ( b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0)
c  in CNF:
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨  b^{4, 148}_2
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨  b^{4, 148}_1
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨  p_588 ∨ -b^{4, 148}_0
c  in DIMACS:
-7994  7995 -7996  588  7997 0
-7994  7995 -7996  588  7998 0
-7994  7995 -7996  588 -7999 0

c  -2-1 --> break 
c    ( b^{4, 147}_2 ∧  b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨  b^{4, 147}_0 ∨  p_588 ∨ break
c  in DIMACS:
-7994 -7995  7996  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 147}_2 ∧ -b^{4, 147}_1 ∧ -b^{4, 147}_0 ∧ true) 
c  in CNF:
c    -b^{4, 147}_2 ∨  b^{4, 147}_1 ∨  b^{4, 147}_0 ∨ false 
c  in DIMACS:
-7994  7995  7996  0

c  3 does not represent an automaton state.
c    -(-b^{4, 147}_2 ∧  b^{4, 147}_1 ∧  b^{4, 147}_0 ∧ true) 
c  in CNF:
c     b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ false 
c  in DIMACS:
 7994 -7995 -7996  0
c  -3 does not represent an automaton state.
c    -( b^{4, 147}_2 ∧  b^{4, 147}_1 ∧  b^{4, 147}_0 ∧ true) 
c  in CNF:
c    -b^{4, 147}_2 ∨ -b^{4, 147}_1 ∨ -b^{4, 147}_0 ∨ false 
c  in DIMACS:
-7994 -7995 -7996  0

c i = 148
c  -2+1 --> -1
c    ( b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧  p_592) -> ( b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0)
c  in CNF:
c    -b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨  b^{4, 149}_2
c    -b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_1
c    -b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨  b^{4, 149}_0
c  in DIMACS:
-7997 -7998  7999 -592  8000 0
-7997 -7998  7999 -592 -8001 0
-7997 -7998  7999 -592  8002 0

c  -1+1 --> 0
c    ( b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0 ∧  p_592) -> (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧ -b^{4, 149}_0)
c  in CNF:
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_2
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_1
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_0
c  in DIMACS:
-7997  7998 -7999 -592 -8000 0
-7997  7998 -7999 -592 -8001 0
-7997  7998 -7999 -592 -8002 0

c  0+1 --> 1
c    (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧  p_592) -> (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0)
c  in CNF:
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_2
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_1
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨  b^{4, 149}_0
c  in DIMACS:
 7997  7998  7999 -592 -8000 0
 7997  7998  7999 -592 -8001 0
 7997  7998  7999 -592  8002 0

c  1+1 --> 2
c    (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0 ∧  p_592) -> (-b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0)
c  in CNF:
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_2
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨  b^{4, 149}_1
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ -p_592 ∨ -b^{4, 149}_0
c  in DIMACS:
 7997  7998 -7999 -592 -8000 0
 7997  7998 -7999 -592  8001 0
 7997  7998 -7999 -592 -8002 0

c  2+1 --> break 
c    (-b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧  p_592) -> break
c  in CNF:
c     b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 7997 -7998  7999 -592 1162 0


c  2-1 --> 1
c    (-b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧ -p_592) -> (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0)
c  in CNF:
c     b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_2
c     b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_1
c     b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨  b^{4, 149}_0
c  in DIMACS:
 7997 -7998  7999  592 -8000 0
 7997 -7998  7999  592 -8001 0
 7997 -7998  7999  592  8002 0

c  1-1 --> 0
c    (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0 ∧ -p_592) -> (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧ -b^{4, 149}_0)
c  in CNF:
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_2
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_1
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_0
c  in DIMACS:
 7997  7998 -7999  592 -8000 0
 7997  7998 -7999  592 -8001 0
 7997  7998 -7999  592 -8002 0

c  0-1 --> -1
c    (-b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧ -p_592) -> ( b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0)
c  in CNF:
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨  b^{4, 149}_2
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_1
c     b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨  b^{4, 149}_0
c  in DIMACS:
 7997  7998  7999  592  8000 0
 7997  7998  7999  592 -8001 0
 7997  7998  7999  592  8002 0

c  -1-1 --> -2
c    ( b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧  b^{4, 148}_0 ∧ -p_592) -> ( b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0)
c  in CNF:
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨  b^{4, 149}_2
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨  b^{4, 149}_1
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨  p_592 ∨ -b^{4, 149}_0
c  in DIMACS:
-7997  7998 -7999  592  8000 0
-7997  7998 -7999  592  8001 0
-7997  7998 -7999  592 -8002 0

c  -2-1 --> break 
c    ( b^{4, 148}_2 ∧  b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨  b^{4, 148}_0 ∨  p_592 ∨ break
c  in DIMACS:
-7997 -7998  7999  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 148}_2 ∧ -b^{4, 148}_1 ∧ -b^{4, 148}_0 ∧ true) 
c  in CNF:
c    -b^{4, 148}_2 ∨  b^{4, 148}_1 ∨  b^{4, 148}_0 ∨ false 
c  in DIMACS:
-7997  7998  7999  0

c  3 does not represent an automaton state.
c    -(-b^{4, 148}_2 ∧  b^{4, 148}_1 ∧  b^{4, 148}_0 ∧ true) 
c  in CNF:
c     b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ false 
c  in DIMACS:
 7997 -7998 -7999  0
c  -3 does not represent an automaton state.
c    -( b^{4, 148}_2 ∧  b^{4, 148}_1 ∧  b^{4, 148}_0 ∧ true) 
c  in CNF:
c    -b^{4, 148}_2 ∨ -b^{4, 148}_1 ∨ -b^{4, 148}_0 ∨ false 
c  in DIMACS:
-7997 -7998 -7999  0

c i = 149
c  -2+1 --> -1
c    ( b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧  p_596) -> ( b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0)
c  in CNF:
c    -b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨  b^{4, 150}_2
c    -b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_1
c    -b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨  b^{4, 150}_0
c  in DIMACS:
-8000 -8001  8002 -596  8003 0
-8000 -8001  8002 -596 -8004 0
-8000 -8001  8002 -596  8005 0

c  -1+1 --> 0
c    ( b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0 ∧  p_596) -> (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧ -b^{4, 150}_0)
c  in CNF:
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_2
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_1
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_0
c  in DIMACS:
-8000  8001 -8002 -596 -8003 0
-8000  8001 -8002 -596 -8004 0
-8000  8001 -8002 -596 -8005 0

c  0+1 --> 1
c    (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧  p_596) -> (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0)
c  in CNF:
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_2
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_1
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨  b^{4, 150}_0
c  in DIMACS:
 8000  8001  8002 -596 -8003 0
 8000  8001  8002 -596 -8004 0
 8000  8001  8002 -596  8005 0

c  1+1 --> 2
c    (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0 ∧  p_596) -> (-b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0)
c  in CNF:
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_2
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨  b^{4, 150}_1
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ -p_596 ∨ -b^{4, 150}_0
c  in DIMACS:
 8000  8001 -8002 -596 -8003 0
 8000  8001 -8002 -596  8004 0
 8000  8001 -8002 -596 -8005 0

c  2+1 --> break 
c    (-b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧  p_596) -> break
c  in CNF:
c     b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ -p_596 ∨ break
c  in DIMACS:
 8000 -8001  8002 -596 1162 0


c  2-1 --> 1
c    (-b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧ -p_596) -> (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0)
c  in CNF:
c     b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_2
c     b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_1
c     b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨  b^{4, 150}_0
c  in DIMACS:
 8000 -8001  8002  596 -8003 0
 8000 -8001  8002  596 -8004 0
 8000 -8001  8002  596  8005 0

c  1-1 --> 0
c    (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0 ∧ -p_596) -> (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧ -b^{4, 150}_0)
c  in CNF:
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_2
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_1
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_0
c  in DIMACS:
 8000  8001 -8002  596 -8003 0
 8000  8001 -8002  596 -8004 0
 8000  8001 -8002  596 -8005 0

c  0-1 --> -1
c    (-b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧ -p_596) -> ( b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0)
c  in CNF:
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨  b^{4, 150}_2
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_1
c     b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨  b^{4, 150}_0
c  in DIMACS:
 8000  8001  8002  596  8003 0
 8000  8001  8002  596 -8004 0
 8000  8001  8002  596  8005 0

c  -1-1 --> -2
c    ( b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧  b^{4, 149}_0 ∧ -p_596) -> ( b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0)
c  in CNF:
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨  b^{4, 150}_2
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨  b^{4, 150}_1
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨  p_596 ∨ -b^{4, 150}_0
c  in DIMACS:
-8000  8001 -8002  596  8003 0
-8000  8001 -8002  596  8004 0
-8000  8001 -8002  596 -8005 0

c  -2-1 --> break 
c    ( b^{4, 149}_2 ∧  b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧ -p_596) -> break
c  in CNF:
c    -b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨  b^{4, 149}_0 ∨  p_596 ∨ break
c  in DIMACS:
-8000 -8001  8002  596 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 149}_2 ∧ -b^{4, 149}_1 ∧ -b^{4, 149}_0 ∧ true) 
c  in CNF:
c    -b^{4, 149}_2 ∨  b^{4, 149}_1 ∨  b^{4, 149}_0 ∨ false 
c  in DIMACS:
-8000  8001  8002  0

c  3 does not represent an automaton state.
c    -(-b^{4, 149}_2 ∧  b^{4, 149}_1 ∧  b^{4, 149}_0 ∧ true) 
c  in CNF:
c     b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ false 
c  in DIMACS:
 8000 -8001 -8002  0
c  -3 does not represent an automaton state.
c    -( b^{4, 149}_2 ∧  b^{4, 149}_1 ∧  b^{4, 149}_0 ∧ true) 
c  in CNF:
c    -b^{4, 149}_2 ∨ -b^{4, 149}_1 ∨ -b^{4, 149}_0 ∨ false 
c  in DIMACS:
-8000 -8001 -8002  0

c i = 150
c  -2+1 --> -1
c    ( b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧  p_600) -> ( b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0)
c  in CNF:
c    -b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨  b^{4, 151}_2
c    -b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_1
c    -b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨  b^{4, 151}_0
c  in DIMACS:
-8003 -8004  8005 -600  8006 0
-8003 -8004  8005 -600 -8007 0
-8003 -8004  8005 -600  8008 0

c  -1+1 --> 0
c    ( b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0 ∧  p_600) -> (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧ -b^{4, 151}_0)
c  in CNF:
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_2
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_1
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_0
c  in DIMACS:
-8003  8004 -8005 -600 -8006 0
-8003  8004 -8005 -600 -8007 0
-8003  8004 -8005 -600 -8008 0

c  0+1 --> 1
c    (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧  p_600) -> (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0)
c  in CNF:
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_2
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_1
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨  b^{4, 151}_0
c  in DIMACS:
 8003  8004  8005 -600 -8006 0
 8003  8004  8005 -600 -8007 0
 8003  8004  8005 -600  8008 0

c  1+1 --> 2
c    (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0 ∧  p_600) -> (-b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0)
c  in CNF:
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_2
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨  b^{4, 151}_1
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ -p_600 ∨ -b^{4, 151}_0
c  in DIMACS:
 8003  8004 -8005 -600 -8006 0
 8003  8004 -8005 -600  8007 0
 8003  8004 -8005 -600 -8008 0

c  2+1 --> break 
c    (-b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧  p_600) -> break
c  in CNF:
c     b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 8003 -8004  8005 -600 1162 0


c  2-1 --> 1
c    (-b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧ -p_600) -> (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0)
c  in CNF:
c     b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_2
c     b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_1
c     b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨  b^{4, 151}_0
c  in DIMACS:
 8003 -8004  8005  600 -8006 0
 8003 -8004  8005  600 -8007 0
 8003 -8004  8005  600  8008 0

c  1-1 --> 0
c    (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0 ∧ -p_600) -> (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧ -b^{4, 151}_0)
c  in CNF:
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_2
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_1
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_0
c  in DIMACS:
 8003  8004 -8005  600 -8006 0
 8003  8004 -8005  600 -8007 0
 8003  8004 -8005  600 -8008 0

c  0-1 --> -1
c    (-b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧ -p_600) -> ( b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0)
c  in CNF:
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨  b^{4, 151}_2
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_1
c     b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨  b^{4, 151}_0
c  in DIMACS:
 8003  8004  8005  600  8006 0
 8003  8004  8005  600 -8007 0
 8003  8004  8005  600  8008 0

c  -1-1 --> -2
c    ( b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧  b^{4, 150}_0 ∧ -p_600) -> ( b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0)
c  in CNF:
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨  b^{4, 151}_2
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨  b^{4, 151}_1
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨  p_600 ∨ -b^{4, 151}_0
c  in DIMACS:
-8003  8004 -8005  600  8006 0
-8003  8004 -8005  600  8007 0
-8003  8004 -8005  600 -8008 0

c  -2-1 --> break 
c    ( b^{4, 150}_2 ∧  b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨  b^{4, 150}_0 ∨  p_600 ∨ break
c  in DIMACS:
-8003 -8004  8005  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 150}_2 ∧ -b^{4, 150}_1 ∧ -b^{4, 150}_0 ∧ true) 
c  in CNF:
c    -b^{4, 150}_2 ∨  b^{4, 150}_1 ∨  b^{4, 150}_0 ∨ false 
c  in DIMACS:
-8003  8004  8005  0

c  3 does not represent an automaton state.
c    -(-b^{4, 150}_2 ∧  b^{4, 150}_1 ∧  b^{4, 150}_0 ∧ true) 
c  in CNF:
c     b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ false 
c  in DIMACS:
 8003 -8004 -8005  0
c  -3 does not represent an automaton state.
c    -( b^{4, 150}_2 ∧  b^{4, 150}_1 ∧  b^{4, 150}_0 ∧ true) 
c  in CNF:
c    -b^{4, 150}_2 ∨ -b^{4, 150}_1 ∨ -b^{4, 150}_0 ∨ false 
c  in DIMACS:
-8003 -8004 -8005  0

c i = 151
c  -2+1 --> -1
c    ( b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧  p_604) -> ( b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0)
c  in CNF:
c    -b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨  b^{4, 152}_2
c    -b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_1
c    -b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨  b^{4, 152}_0
c  in DIMACS:
-8006 -8007  8008 -604  8009 0
-8006 -8007  8008 -604 -8010 0
-8006 -8007  8008 -604  8011 0

c  -1+1 --> 0
c    ( b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0 ∧  p_604) -> (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧ -b^{4, 152}_0)
c  in CNF:
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_2
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_1
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_0
c  in DIMACS:
-8006  8007 -8008 -604 -8009 0
-8006  8007 -8008 -604 -8010 0
-8006  8007 -8008 -604 -8011 0

c  0+1 --> 1
c    (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧  p_604) -> (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0)
c  in CNF:
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_2
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_1
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨  b^{4, 152}_0
c  in DIMACS:
 8006  8007  8008 -604 -8009 0
 8006  8007  8008 -604 -8010 0
 8006  8007  8008 -604  8011 0

c  1+1 --> 2
c    (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0 ∧  p_604) -> (-b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0)
c  in CNF:
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_2
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨  b^{4, 152}_1
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ -p_604 ∨ -b^{4, 152}_0
c  in DIMACS:
 8006  8007 -8008 -604 -8009 0
 8006  8007 -8008 -604  8010 0
 8006  8007 -8008 -604 -8011 0

c  2+1 --> break 
c    (-b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧  p_604) -> break
c  in CNF:
c     b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ -p_604 ∨ break
c  in DIMACS:
 8006 -8007  8008 -604 1162 0


c  2-1 --> 1
c    (-b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧ -p_604) -> (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0)
c  in CNF:
c     b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_2
c     b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_1
c     b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨  b^{4, 152}_0
c  in DIMACS:
 8006 -8007  8008  604 -8009 0
 8006 -8007  8008  604 -8010 0
 8006 -8007  8008  604  8011 0

c  1-1 --> 0
c    (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0 ∧ -p_604) -> (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧ -b^{4, 152}_0)
c  in CNF:
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_2
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_1
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_0
c  in DIMACS:
 8006  8007 -8008  604 -8009 0
 8006  8007 -8008  604 -8010 0
 8006  8007 -8008  604 -8011 0

c  0-1 --> -1
c    (-b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧ -p_604) -> ( b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0)
c  in CNF:
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨  b^{4, 152}_2
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_1
c     b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨  b^{4, 152}_0
c  in DIMACS:
 8006  8007  8008  604  8009 0
 8006  8007  8008  604 -8010 0
 8006  8007  8008  604  8011 0

c  -1-1 --> -2
c    ( b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧  b^{4, 151}_0 ∧ -p_604) -> ( b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0)
c  in CNF:
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨  b^{4, 152}_2
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨  b^{4, 152}_1
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨  p_604 ∨ -b^{4, 152}_0
c  in DIMACS:
-8006  8007 -8008  604  8009 0
-8006  8007 -8008  604  8010 0
-8006  8007 -8008  604 -8011 0

c  -2-1 --> break 
c    ( b^{4, 151}_2 ∧  b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧ -p_604) -> break
c  in CNF:
c    -b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨  b^{4, 151}_0 ∨  p_604 ∨ break
c  in DIMACS:
-8006 -8007  8008  604 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 151}_2 ∧ -b^{4, 151}_1 ∧ -b^{4, 151}_0 ∧ true) 
c  in CNF:
c    -b^{4, 151}_2 ∨  b^{4, 151}_1 ∨  b^{4, 151}_0 ∨ false 
c  in DIMACS:
-8006  8007  8008  0

c  3 does not represent an automaton state.
c    -(-b^{4, 151}_2 ∧  b^{4, 151}_1 ∧  b^{4, 151}_0 ∧ true) 
c  in CNF:
c     b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ false 
c  in DIMACS:
 8006 -8007 -8008  0
c  -3 does not represent an automaton state.
c    -( b^{4, 151}_2 ∧  b^{4, 151}_1 ∧  b^{4, 151}_0 ∧ true) 
c  in CNF:
c    -b^{4, 151}_2 ∨ -b^{4, 151}_1 ∨ -b^{4, 151}_0 ∨ false 
c  in DIMACS:
-8006 -8007 -8008  0

c i = 152
c  -2+1 --> -1
c    ( b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧  p_608) -> ( b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0)
c  in CNF:
c    -b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨  b^{4, 153}_2
c    -b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_1
c    -b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨  b^{4, 153}_0
c  in DIMACS:
-8009 -8010  8011 -608  8012 0
-8009 -8010  8011 -608 -8013 0
-8009 -8010  8011 -608  8014 0

c  -1+1 --> 0
c    ( b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0 ∧  p_608) -> (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧ -b^{4, 153}_0)
c  in CNF:
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_2
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_1
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_0
c  in DIMACS:
-8009  8010 -8011 -608 -8012 0
-8009  8010 -8011 -608 -8013 0
-8009  8010 -8011 -608 -8014 0

c  0+1 --> 1
c    (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧  p_608) -> (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0)
c  in CNF:
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_2
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_1
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨  b^{4, 153}_0
c  in DIMACS:
 8009  8010  8011 -608 -8012 0
 8009  8010  8011 -608 -8013 0
 8009  8010  8011 -608  8014 0

c  1+1 --> 2
c    (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0 ∧  p_608) -> (-b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0)
c  in CNF:
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_2
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨  b^{4, 153}_1
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ -p_608 ∨ -b^{4, 153}_0
c  in DIMACS:
 8009  8010 -8011 -608 -8012 0
 8009  8010 -8011 -608  8013 0
 8009  8010 -8011 -608 -8014 0

c  2+1 --> break 
c    (-b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧  p_608) -> break
c  in CNF:
c     b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 8009 -8010  8011 -608 1162 0


c  2-1 --> 1
c    (-b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧ -p_608) -> (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0)
c  in CNF:
c     b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_2
c     b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_1
c     b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨  b^{4, 153}_0
c  in DIMACS:
 8009 -8010  8011  608 -8012 0
 8009 -8010  8011  608 -8013 0
 8009 -8010  8011  608  8014 0

c  1-1 --> 0
c    (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0 ∧ -p_608) -> (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧ -b^{4, 153}_0)
c  in CNF:
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_2
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_1
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_0
c  in DIMACS:
 8009  8010 -8011  608 -8012 0
 8009  8010 -8011  608 -8013 0
 8009  8010 -8011  608 -8014 0

c  0-1 --> -1
c    (-b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧ -p_608) -> ( b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0)
c  in CNF:
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨  b^{4, 153}_2
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_1
c     b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨  b^{4, 153}_0
c  in DIMACS:
 8009  8010  8011  608  8012 0
 8009  8010  8011  608 -8013 0
 8009  8010  8011  608  8014 0

c  -1-1 --> -2
c    ( b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧  b^{4, 152}_0 ∧ -p_608) -> ( b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0)
c  in CNF:
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨  b^{4, 153}_2
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨  b^{4, 153}_1
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨  p_608 ∨ -b^{4, 153}_0
c  in DIMACS:
-8009  8010 -8011  608  8012 0
-8009  8010 -8011  608  8013 0
-8009  8010 -8011  608 -8014 0

c  -2-1 --> break 
c    ( b^{4, 152}_2 ∧  b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨  b^{4, 152}_0 ∨  p_608 ∨ break
c  in DIMACS:
-8009 -8010  8011  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 152}_2 ∧ -b^{4, 152}_1 ∧ -b^{4, 152}_0 ∧ true) 
c  in CNF:
c    -b^{4, 152}_2 ∨  b^{4, 152}_1 ∨  b^{4, 152}_0 ∨ false 
c  in DIMACS:
-8009  8010  8011  0

c  3 does not represent an automaton state.
c    -(-b^{4, 152}_2 ∧  b^{4, 152}_1 ∧  b^{4, 152}_0 ∧ true) 
c  in CNF:
c     b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ false 
c  in DIMACS:
 8009 -8010 -8011  0
c  -3 does not represent an automaton state.
c    -( b^{4, 152}_2 ∧  b^{4, 152}_1 ∧  b^{4, 152}_0 ∧ true) 
c  in CNF:
c    -b^{4, 152}_2 ∨ -b^{4, 152}_1 ∨ -b^{4, 152}_0 ∨ false 
c  in DIMACS:
-8009 -8010 -8011  0

c i = 153
c  -2+1 --> -1
c    ( b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧  p_612) -> ( b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0)
c  in CNF:
c    -b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨  b^{4, 154}_2
c    -b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_1
c    -b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨  b^{4, 154}_0
c  in DIMACS:
-8012 -8013  8014 -612  8015 0
-8012 -8013  8014 -612 -8016 0
-8012 -8013  8014 -612  8017 0

c  -1+1 --> 0
c    ( b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0 ∧  p_612) -> (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧ -b^{4, 154}_0)
c  in CNF:
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_2
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_1
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_0
c  in DIMACS:
-8012  8013 -8014 -612 -8015 0
-8012  8013 -8014 -612 -8016 0
-8012  8013 -8014 -612 -8017 0

c  0+1 --> 1
c    (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧  p_612) -> (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0)
c  in CNF:
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_2
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_1
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨  b^{4, 154}_0
c  in DIMACS:
 8012  8013  8014 -612 -8015 0
 8012  8013  8014 -612 -8016 0
 8012  8013  8014 -612  8017 0

c  1+1 --> 2
c    (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0 ∧  p_612) -> (-b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0)
c  in CNF:
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_2
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨  b^{4, 154}_1
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ -p_612 ∨ -b^{4, 154}_0
c  in DIMACS:
 8012  8013 -8014 -612 -8015 0
 8012  8013 -8014 -612  8016 0
 8012  8013 -8014 -612 -8017 0

c  2+1 --> break 
c    (-b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧  p_612) -> break
c  in CNF:
c     b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 8012 -8013  8014 -612 1162 0


c  2-1 --> 1
c    (-b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧ -p_612) -> (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0)
c  in CNF:
c     b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_2
c     b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_1
c     b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨  b^{4, 154}_0
c  in DIMACS:
 8012 -8013  8014  612 -8015 0
 8012 -8013  8014  612 -8016 0
 8012 -8013  8014  612  8017 0

c  1-1 --> 0
c    (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0 ∧ -p_612) -> (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧ -b^{4, 154}_0)
c  in CNF:
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_2
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_1
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_0
c  in DIMACS:
 8012  8013 -8014  612 -8015 0
 8012  8013 -8014  612 -8016 0
 8012  8013 -8014  612 -8017 0

c  0-1 --> -1
c    (-b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧ -p_612) -> ( b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0)
c  in CNF:
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨  b^{4, 154}_2
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_1
c     b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨  b^{4, 154}_0
c  in DIMACS:
 8012  8013  8014  612  8015 0
 8012  8013  8014  612 -8016 0
 8012  8013  8014  612  8017 0

c  -1-1 --> -2
c    ( b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧  b^{4, 153}_0 ∧ -p_612) -> ( b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0)
c  in CNF:
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨  b^{4, 154}_2
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨  b^{4, 154}_1
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨  p_612 ∨ -b^{4, 154}_0
c  in DIMACS:
-8012  8013 -8014  612  8015 0
-8012  8013 -8014  612  8016 0
-8012  8013 -8014  612 -8017 0

c  -2-1 --> break 
c    ( b^{4, 153}_2 ∧  b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨  b^{4, 153}_0 ∨  p_612 ∨ break
c  in DIMACS:
-8012 -8013  8014  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 153}_2 ∧ -b^{4, 153}_1 ∧ -b^{4, 153}_0 ∧ true) 
c  in CNF:
c    -b^{4, 153}_2 ∨  b^{4, 153}_1 ∨  b^{4, 153}_0 ∨ false 
c  in DIMACS:
-8012  8013  8014  0

c  3 does not represent an automaton state.
c    -(-b^{4, 153}_2 ∧  b^{4, 153}_1 ∧  b^{4, 153}_0 ∧ true) 
c  in CNF:
c     b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ false 
c  in DIMACS:
 8012 -8013 -8014  0
c  -3 does not represent an automaton state.
c    -( b^{4, 153}_2 ∧  b^{4, 153}_1 ∧  b^{4, 153}_0 ∧ true) 
c  in CNF:
c    -b^{4, 153}_2 ∨ -b^{4, 153}_1 ∨ -b^{4, 153}_0 ∨ false 
c  in DIMACS:
-8012 -8013 -8014  0

c i = 154
c  -2+1 --> -1
c    ( b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧  p_616) -> ( b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0)
c  in CNF:
c    -b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨  b^{4, 155}_2
c    -b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_1
c    -b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨  b^{4, 155}_0
c  in DIMACS:
-8015 -8016  8017 -616  8018 0
-8015 -8016  8017 -616 -8019 0
-8015 -8016  8017 -616  8020 0

c  -1+1 --> 0
c    ( b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0 ∧  p_616) -> (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧ -b^{4, 155}_0)
c  in CNF:
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_2
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_1
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_0
c  in DIMACS:
-8015  8016 -8017 -616 -8018 0
-8015  8016 -8017 -616 -8019 0
-8015  8016 -8017 -616 -8020 0

c  0+1 --> 1
c    (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧  p_616) -> (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0)
c  in CNF:
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_2
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_1
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨  b^{4, 155}_0
c  in DIMACS:
 8015  8016  8017 -616 -8018 0
 8015  8016  8017 -616 -8019 0
 8015  8016  8017 -616  8020 0

c  1+1 --> 2
c    (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0 ∧  p_616) -> (-b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0)
c  in CNF:
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_2
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨  b^{4, 155}_1
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ -p_616 ∨ -b^{4, 155}_0
c  in DIMACS:
 8015  8016 -8017 -616 -8018 0
 8015  8016 -8017 -616  8019 0
 8015  8016 -8017 -616 -8020 0

c  2+1 --> break 
c    (-b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧  p_616) -> break
c  in CNF:
c     b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 8015 -8016  8017 -616 1162 0


c  2-1 --> 1
c    (-b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧ -p_616) -> (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0)
c  in CNF:
c     b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_2
c     b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_1
c     b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨  b^{4, 155}_0
c  in DIMACS:
 8015 -8016  8017  616 -8018 0
 8015 -8016  8017  616 -8019 0
 8015 -8016  8017  616  8020 0

c  1-1 --> 0
c    (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0 ∧ -p_616) -> (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧ -b^{4, 155}_0)
c  in CNF:
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_2
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_1
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_0
c  in DIMACS:
 8015  8016 -8017  616 -8018 0
 8015  8016 -8017  616 -8019 0
 8015  8016 -8017  616 -8020 0

c  0-1 --> -1
c    (-b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧ -p_616) -> ( b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0)
c  in CNF:
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨  b^{4, 155}_2
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_1
c     b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨  b^{4, 155}_0
c  in DIMACS:
 8015  8016  8017  616  8018 0
 8015  8016  8017  616 -8019 0
 8015  8016  8017  616  8020 0

c  -1-1 --> -2
c    ( b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧  b^{4, 154}_0 ∧ -p_616) -> ( b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0)
c  in CNF:
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨  b^{4, 155}_2
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨  b^{4, 155}_1
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨  p_616 ∨ -b^{4, 155}_0
c  in DIMACS:
-8015  8016 -8017  616  8018 0
-8015  8016 -8017  616  8019 0
-8015  8016 -8017  616 -8020 0

c  -2-1 --> break 
c    ( b^{4, 154}_2 ∧  b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨  b^{4, 154}_0 ∨  p_616 ∨ break
c  in DIMACS:
-8015 -8016  8017  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 154}_2 ∧ -b^{4, 154}_1 ∧ -b^{4, 154}_0 ∧ true) 
c  in CNF:
c    -b^{4, 154}_2 ∨  b^{4, 154}_1 ∨  b^{4, 154}_0 ∨ false 
c  in DIMACS:
-8015  8016  8017  0

c  3 does not represent an automaton state.
c    -(-b^{4, 154}_2 ∧  b^{4, 154}_1 ∧  b^{4, 154}_0 ∧ true) 
c  in CNF:
c     b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ false 
c  in DIMACS:
 8015 -8016 -8017  0
c  -3 does not represent an automaton state.
c    -( b^{4, 154}_2 ∧  b^{4, 154}_1 ∧  b^{4, 154}_0 ∧ true) 
c  in CNF:
c    -b^{4, 154}_2 ∨ -b^{4, 154}_1 ∨ -b^{4, 154}_0 ∨ false 
c  in DIMACS:
-8015 -8016 -8017  0

c i = 155
c  -2+1 --> -1
c    ( b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧  p_620) -> ( b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0)
c  in CNF:
c    -b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨  b^{4, 156}_2
c    -b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_1
c    -b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨  b^{4, 156}_0
c  in DIMACS:
-8018 -8019  8020 -620  8021 0
-8018 -8019  8020 -620 -8022 0
-8018 -8019  8020 -620  8023 0

c  -1+1 --> 0
c    ( b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0 ∧  p_620) -> (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧ -b^{4, 156}_0)
c  in CNF:
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_2
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_1
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_0
c  in DIMACS:
-8018  8019 -8020 -620 -8021 0
-8018  8019 -8020 -620 -8022 0
-8018  8019 -8020 -620 -8023 0

c  0+1 --> 1
c    (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧  p_620) -> (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0)
c  in CNF:
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_2
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_1
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨  b^{4, 156}_0
c  in DIMACS:
 8018  8019  8020 -620 -8021 0
 8018  8019  8020 -620 -8022 0
 8018  8019  8020 -620  8023 0

c  1+1 --> 2
c    (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0 ∧  p_620) -> (-b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0)
c  in CNF:
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_2
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨  b^{4, 156}_1
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ -p_620 ∨ -b^{4, 156}_0
c  in DIMACS:
 8018  8019 -8020 -620 -8021 0
 8018  8019 -8020 -620  8022 0
 8018  8019 -8020 -620 -8023 0

c  2+1 --> break 
c    (-b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧  p_620) -> break
c  in CNF:
c     b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 8018 -8019  8020 -620 1162 0


c  2-1 --> 1
c    (-b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧ -p_620) -> (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0)
c  in CNF:
c     b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_2
c     b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_1
c     b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨  b^{4, 156}_0
c  in DIMACS:
 8018 -8019  8020  620 -8021 0
 8018 -8019  8020  620 -8022 0
 8018 -8019  8020  620  8023 0

c  1-1 --> 0
c    (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0 ∧ -p_620) -> (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧ -b^{4, 156}_0)
c  in CNF:
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_2
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_1
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_0
c  in DIMACS:
 8018  8019 -8020  620 -8021 0
 8018  8019 -8020  620 -8022 0
 8018  8019 -8020  620 -8023 0

c  0-1 --> -1
c    (-b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧ -p_620) -> ( b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0)
c  in CNF:
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨  b^{4, 156}_2
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_1
c     b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨  b^{4, 156}_0
c  in DIMACS:
 8018  8019  8020  620  8021 0
 8018  8019  8020  620 -8022 0
 8018  8019  8020  620  8023 0

c  -1-1 --> -2
c    ( b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧  b^{4, 155}_0 ∧ -p_620) -> ( b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0)
c  in CNF:
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨  b^{4, 156}_2
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨  b^{4, 156}_1
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨  p_620 ∨ -b^{4, 156}_0
c  in DIMACS:
-8018  8019 -8020  620  8021 0
-8018  8019 -8020  620  8022 0
-8018  8019 -8020  620 -8023 0

c  -2-1 --> break 
c    ( b^{4, 155}_2 ∧  b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨  b^{4, 155}_0 ∨  p_620 ∨ break
c  in DIMACS:
-8018 -8019  8020  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 155}_2 ∧ -b^{4, 155}_1 ∧ -b^{4, 155}_0 ∧ true) 
c  in CNF:
c    -b^{4, 155}_2 ∨  b^{4, 155}_1 ∨  b^{4, 155}_0 ∨ false 
c  in DIMACS:
-8018  8019  8020  0

c  3 does not represent an automaton state.
c    -(-b^{4, 155}_2 ∧  b^{4, 155}_1 ∧  b^{4, 155}_0 ∧ true) 
c  in CNF:
c     b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ false 
c  in DIMACS:
 8018 -8019 -8020  0
c  -3 does not represent an automaton state.
c    -( b^{4, 155}_2 ∧  b^{4, 155}_1 ∧  b^{4, 155}_0 ∧ true) 
c  in CNF:
c    -b^{4, 155}_2 ∨ -b^{4, 155}_1 ∨ -b^{4, 155}_0 ∨ false 
c  in DIMACS:
-8018 -8019 -8020  0

c i = 156
c  -2+1 --> -1
c    ( b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧  p_624) -> ( b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0)
c  in CNF:
c    -b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨  b^{4, 157}_2
c    -b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_1
c    -b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨  b^{4, 157}_0
c  in DIMACS:
-8021 -8022  8023 -624  8024 0
-8021 -8022  8023 -624 -8025 0
-8021 -8022  8023 -624  8026 0

c  -1+1 --> 0
c    ( b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0 ∧  p_624) -> (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧ -b^{4, 157}_0)
c  in CNF:
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_2
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_1
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_0
c  in DIMACS:
-8021  8022 -8023 -624 -8024 0
-8021  8022 -8023 -624 -8025 0
-8021  8022 -8023 -624 -8026 0

c  0+1 --> 1
c    (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧  p_624) -> (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0)
c  in CNF:
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_2
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_1
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨  b^{4, 157}_0
c  in DIMACS:
 8021  8022  8023 -624 -8024 0
 8021  8022  8023 -624 -8025 0
 8021  8022  8023 -624  8026 0

c  1+1 --> 2
c    (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0 ∧  p_624) -> (-b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0)
c  in CNF:
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_2
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨  b^{4, 157}_1
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ -p_624 ∨ -b^{4, 157}_0
c  in DIMACS:
 8021  8022 -8023 -624 -8024 0
 8021  8022 -8023 -624  8025 0
 8021  8022 -8023 -624 -8026 0

c  2+1 --> break 
c    (-b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧  p_624) -> break
c  in CNF:
c     b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 8021 -8022  8023 -624 1162 0


c  2-1 --> 1
c    (-b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧ -p_624) -> (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0)
c  in CNF:
c     b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_2
c     b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_1
c     b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨  b^{4, 157}_0
c  in DIMACS:
 8021 -8022  8023  624 -8024 0
 8021 -8022  8023  624 -8025 0
 8021 -8022  8023  624  8026 0

c  1-1 --> 0
c    (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0 ∧ -p_624) -> (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧ -b^{4, 157}_0)
c  in CNF:
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_2
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_1
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_0
c  in DIMACS:
 8021  8022 -8023  624 -8024 0
 8021  8022 -8023  624 -8025 0
 8021  8022 -8023  624 -8026 0

c  0-1 --> -1
c    (-b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧ -p_624) -> ( b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0)
c  in CNF:
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨  b^{4, 157}_2
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_1
c     b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨  b^{4, 157}_0
c  in DIMACS:
 8021  8022  8023  624  8024 0
 8021  8022  8023  624 -8025 0
 8021  8022  8023  624  8026 0

c  -1-1 --> -2
c    ( b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧  b^{4, 156}_0 ∧ -p_624) -> ( b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0)
c  in CNF:
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨  b^{4, 157}_2
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨  b^{4, 157}_1
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨  p_624 ∨ -b^{4, 157}_0
c  in DIMACS:
-8021  8022 -8023  624  8024 0
-8021  8022 -8023  624  8025 0
-8021  8022 -8023  624 -8026 0

c  -2-1 --> break 
c    ( b^{4, 156}_2 ∧  b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨  b^{4, 156}_0 ∨  p_624 ∨ break
c  in DIMACS:
-8021 -8022  8023  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 156}_2 ∧ -b^{4, 156}_1 ∧ -b^{4, 156}_0 ∧ true) 
c  in CNF:
c    -b^{4, 156}_2 ∨  b^{4, 156}_1 ∨  b^{4, 156}_0 ∨ false 
c  in DIMACS:
-8021  8022  8023  0

c  3 does not represent an automaton state.
c    -(-b^{4, 156}_2 ∧  b^{4, 156}_1 ∧  b^{4, 156}_0 ∧ true) 
c  in CNF:
c     b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ false 
c  in DIMACS:
 8021 -8022 -8023  0
c  -3 does not represent an automaton state.
c    -( b^{4, 156}_2 ∧  b^{4, 156}_1 ∧  b^{4, 156}_0 ∧ true) 
c  in CNF:
c    -b^{4, 156}_2 ∨ -b^{4, 156}_1 ∨ -b^{4, 156}_0 ∨ false 
c  in DIMACS:
-8021 -8022 -8023  0

c i = 157
c  -2+1 --> -1
c    ( b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧  p_628) -> ( b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0)
c  in CNF:
c    -b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨  b^{4, 158}_2
c    -b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_1
c    -b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨  b^{4, 158}_0
c  in DIMACS:
-8024 -8025  8026 -628  8027 0
-8024 -8025  8026 -628 -8028 0
-8024 -8025  8026 -628  8029 0

c  -1+1 --> 0
c    ( b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0 ∧  p_628) -> (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧ -b^{4, 158}_0)
c  in CNF:
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_2
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_1
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_0
c  in DIMACS:
-8024  8025 -8026 -628 -8027 0
-8024  8025 -8026 -628 -8028 0
-8024  8025 -8026 -628 -8029 0

c  0+1 --> 1
c    (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧  p_628) -> (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0)
c  in CNF:
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_2
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_1
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨  b^{4, 158}_0
c  in DIMACS:
 8024  8025  8026 -628 -8027 0
 8024  8025  8026 -628 -8028 0
 8024  8025  8026 -628  8029 0

c  1+1 --> 2
c    (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0 ∧  p_628) -> (-b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0)
c  in CNF:
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_2
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨  b^{4, 158}_1
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ -p_628 ∨ -b^{4, 158}_0
c  in DIMACS:
 8024  8025 -8026 -628 -8027 0
 8024  8025 -8026 -628  8028 0
 8024  8025 -8026 -628 -8029 0

c  2+1 --> break 
c    (-b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧  p_628) -> break
c  in CNF:
c     b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ -p_628 ∨ break
c  in DIMACS:
 8024 -8025  8026 -628 1162 0


c  2-1 --> 1
c    (-b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧ -p_628) -> (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0)
c  in CNF:
c     b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_2
c     b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_1
c     b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨  b^{4, 158}_0
c  in DIMACS:
 8024 -8025  8026  628 -8027 0
 8024 -8025  8026  628 -8028 0
 8024 -8025  8026  628  8029 0

c  1-1 --> 0
c    (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0 ∧ -p_628) -> (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧ -b^{4, 158}_0)
c  in CNF:
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_2
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_1
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_0
c  in DIMACS:
 8024  8025 -8026  628 -8027 0
 8024  8025 -8026  628 -8028 0
 8024  8025 -8026  628 -8029 0

c  0-1 --> -1
c    (-b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧ -p_628) -> ( b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0)
c  in CNF:
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨  b^{4, 158}_2
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_1
c     b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨  b^{4, 158}_0
c  in DIMACS:
 8024  8025  8026  628  8027 0
 8024  8025  8026  628 -8028 0
 8024  8025  8026  628  8029 0

c  -1-1 --> -2
c    ( b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧  b^{4, 157}_0 ∧ -p_628) -> ( b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0)
c  in CNF:
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨  b^{4, 158}_2
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨  b^{4, 158}_1
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨  p_628 ∨ -b^{4, 158}_0
c  in DIMACS:
-8024  8025 -8026  628  8027 0
-8024  8025 -8026  628  8028 0
-8024  8025 -8026  628 -8029 0

c  -2-1 --> break 
c    ( b^{4, 157}_2 ∧  b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧ -p_628) -> break
c  in CNF:
c    -b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨  b^{4, 157}_0 ∨  p_628 ∨ break
c  in DIMACS:
-8024 -8025  8026  628 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 157}_2 ∧ -b^{4, 157}_1 ∧ -b^{4, 157}_0 ∧ true) 
c  in CNF:
c    -b^{4, 157}_2 ∨  b^{4, 157}_1 ∨  b^{4, 157}_0 ∨ false 
c  in DIMACS:
-8024  8025  8026  0

c  3 does not represent an automaton state.
c    -(-b^{4, 157}_2 ∧  b^{4, 157}_1 ∧  b^{4, 157}_0 ∧ true) 
c  in CNF:
c     b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ false 
c  in DIMACS:
 8024 -8025 -8026  0
c  -3 does not represent an automaton state.
c    -( b^{4, 157}_2 ∧  b^{4, 157}_1 ∧  b^{4, 157}_0 ∧ true) 
c  in CNF:
c    -b^{4, 157}_2 ∨ -b^{4, 157}_1 ∨ -b^{4, 157}_0 ∨ false 
c  in DIMACS:
-8024 -8025 -8026  0

c i = 158
c  -2+1 --> -1
c    ( b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧  p_632) -> ( b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0)
c  in CNF:
c    -b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨  b^{4, 159}_2
c    -b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_1
c    -b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨  b^{4, 159}_0
c  in DIMACS:
-8027 -8028  8029 -632  8030 0
-8027 -8028  8029 -632 -8031 0
-8027 -8028  8029 -632  8032 0

c  -1+1 --> 0
c    ( b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0 ∧  p_632) -> (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧ -b^{4, 159}_0)
c  in CNF:
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_2
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_1
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_0
c  in DIMACS:
-8027  8028 -8029 -632 -8030 0
-8027  8028 -8029 -632 -8031 0
-8027  8028 -8029 -632 -8032 0

c  0+1 --> 1
c    (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧  p_632) -> (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0)
c  in CNF:
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_2
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_1
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨  b^{4, 159}_0
c  in DIMACS:
 8027  8028  8029 -632 -8030 0
 8027  8028  8029 -632 -8031 0
 8027  8028  8029 -632  8032 0

c  1+1 --> 2
c    (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0 ∧  p_632) -> (-b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0)
c  in CNF:
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_2
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨  b^{4, 159}_1
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ -p_632 ∨ -b^{4, 159}_0
c  in DIMACS:
 8027  8028 -8029 -632 -8030 0
 8027  8028 -8029 -632  8031 0
 8027  8028 -8029 -632 -8032 0

c  2+1 --> break 
c    (-b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧  p_632) -> break
c  in CNF:
c     b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 8027 -8028  8029 -632 1162 0


c  2-1 --> 1
c    (-b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧ -p_632) -> (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0)
c  in CNF:
c     b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_2
c     b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_1
c     b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨  b^{4, 159}_0
c  in DIMACS:
 8027 -8028  8029  632 -8030 0
 8027 -8028  8029  632 -8031 0
 8027 -8028  8029  632  8032 0

c  1-1 --> 0
c    (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0 ∧ -p_632) -> (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧ -b^{4, 159}_0)
c  in CNF:
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_2
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_1
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_0
c  in DIMACS:
 8027  8028 -8029  632 -8030 0
 8027  8028 -8029  632 -8031 0
 8027  8028 -8029  632 -8032 0

c  0-1 --> -1
c    (-b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧ -p_632) -> ( b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0)
c  in CNF:
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨  b^{4, 159}_2
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_1
c     b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨  b^{4, 159}_0
c  in DIMACS:
 8027  8028  8029  632  8030 0
 8027  8028  8029  632 -8031 0
 8027  8028  8029  632  8032 0

c  -1-1 --> -2
c    ( b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧  b^{4, 158}_0 ∧ -p_632) -> ( b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0)
c  in CNF:
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨  b^{4, 159}_2
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨  b^{4, 159}_1
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨  p_632 ∨ -b^{4, 159}_0
c  in DIMACS:
-8027  8028 -8029  632  8030 0
-8027  8028 -8029  632  8031 0
-8027  8028 -8029  632 -8032 0

c  -2-1 --> break 
c    ( b^{4, 158}_2 ∧  b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨  b^{4, 158}_0 ∨  p_632 ∨ break
c  in DIMACS:
-8027 -8028  8029  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 158}_2 ∧ -b^{4, 158}_1 ∧ -b^{4, 158}_0 ∧ true) 
c  in CNF:
c    -b^{4, 158}_2 ∨  b^{4, 158}_1 ∨  b^{4, 158}_0 ∨ false 
c  in DIMACS:
-8027  8028  8029  0

c  3 does not represent an automaton state.
c    -(-b^{4, 158}_2 ∧  b^{4, 158}_1 ∧  b^{4, 158}_0 ∧ true) 
c  in CNF:
c     b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ false 
c  in DIMACS:
 8027 -8028 -8029  0
c  -3 does not represent an automaton state.
c    -( b^{4, 158}_2 ∧  b^{4, 158}_1 ∧  b^{4, 158}_0 ∧ true) 
c  in CNF:
c    -b^{4, 158}_2 ∨ -b^{4, 158}_1 ∨ -b^{4, 158}_0 ∨ false 
c  in DIMACS:
-8027 -8028 -8029  0

c i = 159
c  -2+1 --> -1
c    ( b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧  p_636) -> ( b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0)
c  in CNF:
c    -b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨  b^{4, 160}_2
c    -b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_1
c    -b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨  b^{4, 160}_0
c  in DIMACS:
-8030 -8031  8032 -636  8033 0
-8030 -8031  8032 -636 -8034 0
-8030 -8031  8032 -636  8035 0

c  -1+1 --> 0
c    ( b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0 ∧  p_636) -> (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧ -b^{4, 160}_0)
c  in CNF:
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_2
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_1
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_0
c  in DIMACS:
-8030  8031 -8032 -636 -8033 0
-8030  8031 -8032 -636 -8034 0
-8030  8031 -8032 -636 -8035 0

c  0+1 --> 1
c    (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧  p_636) -> (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0)
c  in CNF:
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_2
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_1
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨  b^{4, 160}_0
c  in DIMACS:
 8030  8031  8032 -636 -8033 0
 8030  8031  8032 -636 -8034 0
 8030  8031  8032 -636  8035 0

c  1+1 --> 2
c    (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0 ∧  p_636) -> (-b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0)
c  in CNF:
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_2
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨  b^{4, 160}_1
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ -p_636 ∨ -b^{4, 160}_0
c  in DIMACS:
 8030  8031 -8032 -636 -8033 0
 8030  8031 -8032 -636  8034 0
 8030  8031 -8032 -636 -8035 0

c  2+1 --> break 
c    (-b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧  p_636) -> break
c  in CNF:
c     b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 8030 -8031  8032 -636 1162 0


c  2-1 --> 1
c    (-b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧ -p_636) -> (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0)
c  in CNF:
c     b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_2
c     b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_1
c     b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨  b^{4, 160}_0
c  in DIMACS:
 8030 -8031  8032  636 -8033 0
 8030 -8031  8032  636 -8034 0
 8030 -8031  8032  636  8035 0

c  1-1 --> 0
c    (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0 ∧ -p_636) -> (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧ -b^{4, 160}_0)
c  in CNF:
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_2
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_1
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_0
c  in DIMACS:
 8030  8031 -8032  636 -8033 0
 8030  8031 -8032  636 -8034 0
 8030  8031 -8032  636 -8035 0

c  0-1 --> -1
c    (-b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧ -p_636) -> ( b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0)
c  in CNF:
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨  b^{4, 160}_2
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_1
c     b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨  b^{4, 160}_0
c  in DIMACS:
 8030  8031  8032  636  8033 0
 8030  8031  8032  636 -8034 0
 8030  8031  8032  636  8035 0

c  -1-1 --> -2
c    ( b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧  b^{4, 159}_0 ∧ -p_636) -> ( b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0)
c  in CNF:
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨  b^{4, 160}_2
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨  b^{4, 160}_1
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨  p_636 ∨ -b^{4, 160}_0
c  in DIMACS:
-8030  8031 -8032  636  8033 0
-8030  8031 -8032  636  8034 0
-8030  8031 -8032  636 -8035 0

c  -2-1 --> break 
c    ( b^{4, 159}_2 ∧  b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨  b^{4, 159}_0 ∨  p_636 ∨ break
c  in DIMACS:
-8030 -8031  8032  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 159}_2 ∧ -b^{4, 159}_1 ∧ -b^{4, 159}_0 ∧ true) 
c  in CNF:
c    -b^{4, 159}_2 ∨  b^{4, 159}_1 ∨  b^{4, 159}_0 ∨ false 
c  in DIMACS:
-8030  8031  8032  0

c  3 does not represent an automaton state.
c    -(-b^{4, 159}_2 ∧  b^{4, 159}_1 ∧  b^{4, 159}_0 ∧ true) 
c  in CNF:
c     b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ false 
c  in DIMACS:
 8030 -8031 -8032  0
c  -3 does not represent an automaton state.
c    -( b^{4, 159}_2 ∧  b^{4, 159}_1 ∧  b^{4, 159}_0 ∧ true) 
c  in CNF:
c    -b^{4, 159}_2 ∨ -b^{4, 159}_1 ∨ -b^{4, 159}_0 ∨ false 
c  in DIMACS:
-8030 -8031 -8032  0

c i = 160
c  -2+1 --> -1
c    ( b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧  p_640) -> ( b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0)
c  in CNF:
c    -b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨  b^{4, 161}_2
c    -b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_1
c    -b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨  b^{4, 161}_0
c  in DIMACS:
-8033 -8034  8035 -640  8036 0
-8033 -8034  8035 -640 -8037 0
-8033 -8034  8035 -640  8038 0

c  -1+1 --> 0
c    ( b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0 ∧  p_640) -> (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧ -b^{4, 161}_0)
c  in CNF:
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_2
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_1
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_0
c  in DIMACS:
-8033  8034 -8035 -640 -8036 0
-8033  8034 -8035 -640 -8037 0
-8033  8034 -8035 -640 -8038 0

c  0+1 --> 1
c    (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧  p_640) -> (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0)
c  in CNF:
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_2
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_1
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨  b^{4, 161}_0
c  in DIMACS:
 8033  8034  8035 -640 -8036 0
 8033  8034  8035 -640 -8037 0
 8033  8034  8035 -640  8038 0

c  1+1 --> 2
c    (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0 ∧  p_640) -> (-b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0)
c  in CNF:
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_2
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨  b^{4, 161}_1
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ -p_640 ∨ -b^{4, 161}_0
c  in DIMACS:
 8033  8034 -8035 -640 -8036 0
 8033  8034 -8035 -640  8037 0
 8033  8034 -8035 -640 -8038 0

c  2+1 --> break 
c    (-b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧  p_640) -> break
c  in CNF:
c     b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 8033 -8034  8035 -640 1162 0


c  2-1 --> 1
c    (-b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧ -p_640) -> (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0)
c  in CNF:
c     b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_2
c     b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_1
c     b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨  b^{4, 161}_0
c  in DIMACS:
 8033 -8034  8035  640 -8036 0
 8033 -8034  8035  640 -8037 0
 8033 -8034  8035  640  8038 0

c  1-1 --> 0
c    (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0 ∧ -p_640) -> (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧ -b^{4, 161}_0)
c  in CNF:
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_2
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_1
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_0
c  in DIMACS:
 8033  8034 -8035  640 -8036 0
 8033  8034 -8035  640 -8037 0
 8033  8034 -8035  640 -8038 0

c  0-1 --> -1
c    (-b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧ -p_640) -> ( b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0)
c  in CNF:
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨  b^{4, 161}_2
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_1
c     b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨  b^{4, 161}_0
c  in DIMACS:
 8033  8034  8035  640  8036 0
 8033  8034  8035  640 -8037 0
 8033  8034  8035  640  8038 0

c  -1-1 --> -2
c    ( b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧  b^{4, 160}_0 ∧ -p_640) -> ( b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0)
c  in CNF:
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨  b^{4, 161}_2
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨  b^{4, 161}_1
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨  p_640 ∨ -b^{4, 161}_0
c  in DIMACS:
-8033  8034 -8035  640  8036 0
-8033  8034 -8035  640  8037 0
-8033  8034 -8035  640 -8038 0

c  -2-1 --> break 
c    ( b^{4, 160}_2 ∧  b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨  b^{4, 160}_0 ∨  p_640 ∨ break
c  in DIMACS:
-8033 -8034  8035  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 160}_2 ∧ -b^{4, 160}_1 ∧ -b^{4, 160}_0 ∧ true) 
c  in CNF:
c    -b^{4, 160}_2 ∨  b^{4, 160}_1 ∨  b^{4, 160}_0 ∨ false 
c  in DIMACS:
-8033  8034  8035  0

c  3 does not represent an automaton state.
c    -(-b^{4, 160}_2 ∧  b^{4, 160}_1 ∧  b^{4, 160}_0 ∧ true) 
c  in CNF:
c     b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ false 
c  in DIMACS:
 8033 -8034 -8035  0
c  -3 does not represent an automaton state.
c    -( b^{4, 160}_2 ∧  b^{4, 160}_1 ∧  b^{4, 160}_0 ∧ true) 
c  in CNF:
c    -b^{4, 160}_2 ∨ -b^{4, 160}_1 ∨ -b^{4, 160}_0 ∨ false 
c  in DIMACS:
-8033 -8034 -8035  0

c i = 161
c  -2+1 --> -1
c    ( b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧  p_644) -> ( b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0)
c  in CNF:
c    -b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨  b^{4, 162}_2
c    -b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_1
c    -b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨  b^{4, 162}_0
c  in DIMACS:
-8036 -8037  8038 -644  8039 0
-8036 -8037  8038 -644 -8040 0
-8036 -8037  8038 -644  8041 0

c  -1+1 --> 0
c    ( b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0 ∧  p_644) -> (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧ -b^{4, 162}_0)
c  in CNF:
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_2
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_1
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_0
c  in DIMACS:
-8036  8037 -8038 -644 -8039 0
-8036  8037 -8038 -644 -8040 0
-8036  8037 -8038 -644 -8041 0

c  0+1 --> 1
c    (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧  p_644) -> (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0)
c  in CNF:
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_2
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_1
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨  b^{4, 162}_0
c  in DIMACS:
 8036  8037  8038 -644 -8039 0
 8036  8037  8038 -644 -8040 0
 8036  8037  8038 -644  8041 0

c  1+1 --> 2
c    (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0 ∧  p_644) -> (-b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0)
c  in CNF:
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_2
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨  b^{4, 162}_1
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ -p_644 ∨ -b^{4, 162}_0
c  in DIMACS:
 8036  8037 -8038 -644 -8039 0
 8036  8037 -8038 -644  8040 0
 8036  8037 -8038 -644 -8041 0

c  2+1 --> break 
c    (-b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧  p_644) -> break
c  in CNF:
c     b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 8036 -8037  8038 -644 1162 0


c  2-1 --> 1
c    (-b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧ -p_644) -> (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0)
c  in CNF:
c     b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_2
c     b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_1
c     b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨  b^{4, 162}_0
c  in DIMACS:
 8036 -8037  8038  644 -8039 0
 8036 -8037  8038  644 -8040 0
 8036 -8037  8038  644  8041 0

c  1-1 --> 0
c    (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0 ∧ -p_644) -> (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧ -b^{4, 162}_0)
c  in CNF:
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_2
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_1
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_0
c  in DIMACS:
 8036  8037 -8038  644 -8039 0
 8036  8037 -8038  644 -8040 0
 8036  8037 -8038  644 -8041 0

c  0-1 --> -1
c    (-b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧ -p_644) -> ( b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0)
c  in CNF:
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨  b^{4, 162}_2
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_1
c     b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨  b^{4, 162}_0
c  in DIMACS:
 8036  8037  8038  644  8039 0
 8036  8037  8038  644 -8040 0
 8036  8037  8038  644  8041 0

c  -1-1 --> -2
c    ( b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧  b^{4, 161}_0 ∧ -p_644) -> ( b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0)
c  in CNF:
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨  b^{4, 162}_2
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨  b^{4, 162}_1
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨  p_644 ∨ -b^{4, 162}_0
c  in DIMACS:
-8036  8037 -8038  644  8039 0
-8036  8037 -8038  644  8040 0
-8036  8037 -8038  644 -8041 0

c  -2-1 --> break 
c    ( b^{4, 161}_2 ∧  b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨  b^{4, 161}_0 ∨  p_644 ∨ break
c  in DIMACS:
-8036 -8037  8038  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 161}_2 ∧ -b^{4, 161}_1 ∧ -b^{4, 161}_0 ∧ true) 
c  in CNF:
c    -b^{4, 161}_2 ∨  b^{4, 161}_1 ∨  b^{4, 161}_0 ∨ false 
c  in DIMACS:
-8036  8037  8038  0

c  3 does not represent an automaton state.
c    -(-b^{4, 161}_2 ∧  b^{4, 161}_1 ∧  b^{4, 161}_0 ∧ true) 
c  in CNF:
c     b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ false 
c  in DIMACS:
 8036 -8037 -8038  0
c  -3 does not represent an automaton state.
c    -( b^{4, 161}_2 ∧  b^{4, 161}_1 ∧  b^{4, 161}_0 ∧ true) 
c  in CNF:
c    -b^{4, 161}_2 ∨ -b^{4, 161}_1 ∨ -b^{4, 161}_0 ∨ false 
c  in DIMACS:
-8036 -8037 -8038  0

c i = 162
c  -2+1 --> -1
c    ( b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧  p_648) -> ( b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0)
c  in CNF:
c    -b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨  b^{4, 163}_2
c    -b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_1
c    -b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨  b^{4, 163}_0
c  in DIMACS:
-8039 -8040  8041 -648  8042 0
-8039 -8040  8041 -648 -8043 0
-8039 -8040  8041 -648  8044 0

c  -1+1 --> 0
c    ( b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0 ∧  p_648) -> (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧ -b^{4, 163}_0)
c  in CNF:
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_2
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_1
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_0
c  in DIMACS:
-8039  8040 -8041 -648 -8042 0
-8039  8040 -8041 -648 -8043 0
-8039  8040 -8041 -648 -8044 0

c  0+1 --> 1
c    (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧  p_648) -> (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0)
c  in CNF:
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_2
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_1
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨  b^{4, 163}_0
c  in DIMACS:
 8039  8040  8041 -648 -8042 0
 8039  8040  8041 -648 -8043 0
 8039  8040  8041 -648  8044 0

c  1+1 --> 2
c    (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0 ∧  p_648) -> (-b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0)
c  in CNF:
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_2
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨  b^{4, 163}_1
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ -p_648 ∨ -b^{4, 163}_0
c  in DIMACS:
 8039  8040 -8041 -648 -8042 0
 8039  8040 -8041 -648  8043 0
 8039  8040 -8041 -648 -8044 0

c  2+1 --> break 
c    (-b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧  p_648) -> break
c  in CNF:
c     b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 8039 -8040  8041 -648 1162 0


c  2-1 --> 1
c    (-b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧ -p_648) -> (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0)
c  in CNF:
c     b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_2
c     b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_1
c     b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨  b^{4, 163}_0
c  in DIMACS:
 8039 -8040  8041  648 -8042 0
 8039 -8040  8041  648 -8043 0
 8039 -8040  8041  648  8044 0

c  1-1 --> 0
c    (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0 ∧ -p_648) -> (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧ -b^{4, 163}_0)
c  in CNF:
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_2
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_1
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_0
c  in DIMACS:
 8039  8040 -8041  648 -8042 0
 8039  8040 -8041  648 -8043 0
 8039  8040 -8041  648 -8044 0

c  0-1 --> -1
c    (-b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧ -p_648) -> ( b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0)
c  in CNF:
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨  b^{4, 163}_2
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_1
c     b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨  b^{4, 163}_0
c  in DIMACS:
 8039  8040  8041  648  8042 0
 8039  8040  8041  648 -8043 0
 8039  8040  8041  648  8044 0

c  -1-1 --> -2
c    ( b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧  b^{4, 162}_0 ∧ -p_648) -> ( b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0)
c  in CNF:
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨  b^{4, 163}_2
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨  b^{4, 163}_1
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨  p_648 ∨ -b^{4, 163}_0
c  in DIMACS:
-8039  8040 -8041  648  8042 0
-8039  8040 -8041  648  8043 0
-8039  8040 -8041  648 -8044 0

c  -2-1 --> break 
c    ( b^{4, 162}_2 ∧  b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨  b^{4, 162}_0 ∨  p_648 ∨ break
c  in DIMACS:
-8039 -8040  8041  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 162}_2 ∧ -b^{4, 162}_1 ∧ -b^{4, 162}_0 ∧ true) 
c  in CNF:
c    -b^{4, 162}_2 ∨  b^{4, 162}_1 ∨  b^{4, 162}_0 ∨ false 
c  in DIMACS:
-8039  8040  8041  0

c  3 does not represent an automaton state.
c    -(-b^{4, 162}_2 ∧  b^{4, 162}_1 ∧  b^{4, 162}_0 ∧ true) 
c  in CNF:
c     b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ false 
c  in DIMACS:
 8039 -8040 -8041  0
c  -3 does not represent an automaton state.
c    -( b^{4, 162}_2 ∧  b^{4, 162}_1 ∧  b^{4, 162}_0 ∧ true) 
c  in CNF:
c    -b^{4, 162}_2 ∨ -b^{4, 162}_1 ∨ -b^{4, 162}_0 ∨ false 
c  in DIMACS:
-8039 -8040 -8041  0

c i = 163
c  -2+1 --> -1
c    ( b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧  p_652) -> ( b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0)
c  in CNF:
c    -b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨  b^{4, 164}_2
c    -b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_1
c    -b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨  b^{4, 164}_0
c  in DIMACS:
-8042 -8043  8044 -652  8045 0
-8042 -8043  8044 -652 -8046 0
-8042 -8043  8044 -652  8047 0

c  -1+1 --> 0
c    ( b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0 ∧  p_652) -> (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧ -b^{4, 164}_0)
c  in CNF:
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_2
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_1
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_0
c  in DIMACS:
-8042  8043 -8044 -652 -8045 0
-8042  8043 -8044 -652 -8046 0
-8042  8043 -8044 -652 -8047 0

c  0+1 --> 1
c    (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧  p_652) -> (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0)
c  in CNF:
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_2
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_1
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨  b^{4, 164}_0
c  in DIMACS:
 8042  8043  8044 -652 -8045 0
 8042  8043  8044 -652 -8046 0
 8042  8043  8044 -652  8047 0

c  1+1 --> 2
c    (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0 ∧  p_652) -> (-b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0)
c  in CNF:
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_2
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨  b^{4, 164}_1
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ -p_652 ∨ -b^{4, 164}_0
c  in DIMACS:
 8042  8043 -8044 -652 -8045 0
 8042  8043 -8044 -652  8046 0
 8042  8043 -8044 -652 -8047 0

c  2+1 --> break 
c    (-b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧  p_652) -> break
c  in CNF:
c     b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ -p_652 ∨ break
c  in DIMACS:
 8042 -8043  8044 -652 1162 0


c  2-1 --> 1
c    (-b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧ -p_652) -> (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0)
c  in CNF:
c     b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_2
c     b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_1
c     b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨  b^{4, 164}_0
c  in DIMACS:
 8042 -8043  8044  652 -8045 0
 8042 -8043  8044  652 -8046 0
 8042 -8043  8044  652  8047 0

c  1-1 --> 0
c    (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0 ∧ -p_652) -> (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧ -b^{4, 164}_0)
c  in CNF:
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_2
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_1
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_0
c  in DIMACS:
 8042  8043 -8044  652 -8045 0
 8042  8043 -8044  652 -8046 0
 8042  8043 -8044  652 -8047 0

c  0-1 --> -1
c    (-b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧ -p_652) -> ( b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0)
c  in CNF:
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨  b^{4, 164}_2
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_1
c     b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨  b^{4, 164}_0
c  in DIMACS:
 8042  8043  8044  652  8045 0
 8042  8043  8044  652 -8046 0
 8042  8043  8044  652  8047 0

c  -1-1 --> -2
c    ( b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧  b^{4, 163}_0 ∧ -p_652) -> ( b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0)
c  in CNF:
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨  b^{4, 164}_2
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨  b^{4, 164}_1
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨  p_652 ∨ -b^{4, 164}_0
c  in DIMACS:
-8042  8043 -8044  652  8045 0
-8042  8043 -8044  652  8046 0
-8042  8043 -8044  652 -8047 0

c  -2-1 --> break 
c    ( b^{4, 163}_2 ∧  b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧ -p_652) -> break
c  in CNF:
c    -b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨  b^{4, 163}_0 ∨  p_652 ∨ break
c  in DIMACS:
-8042 -8043  8044  652 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 163}_2 ∧ -b^{4, 163}_1 ∧ -b^{4, 163}_0 ∧ true) 
c  in CNF:
c    -b^{4, 163}_2 ∨  b^{4, 163}_1 ∨  b^{4, 163}_0 ∨ false 
c  in DIMACS:
-8042  8043  8044  0

c  3 does not represent an automaton state.
c    -(-b^{4, 163}_2 ∧  b^{4, 163}_1 ∧  b^{4, 163}_0 ∧ true) 
c  in CNF:
c     b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ false 
c  in DIMACS:
 8042 -8043 -8044  0
c  -3 does not represent an automaton state.
c    -( b^{4, 163}_2 ∧  b^{4, 163}_1 ∧  b^{4, 163}_0 ∧ true) 
c  in CNF:
c    -b^{4, 163}_2 ∨ -b^{4, 163}_1 ∨ -b^{4, 163}_0 ∨ false 
c  in DIMACS:
-8042 -8043 -8044  0

c i = 164
c  -2+1 --> -1
c    ( b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧  p_656) -> ( b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0)
c  in CNF:
c    -b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨  b^{4, 165}_2
c    -b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_1
c    -b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨  b^{4, 165}_0
c  in DIMACS:
-8045 -8046  8047 -656  8048 0
-8045 -8046  8047 -656 -8049 0
-8045 -8046  8047 -656  8050 0

c  -1+1 --> 0
c    ( b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0 ∧  p_656) -> (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧ -b^{4, 165}_0)
c  in CNF:
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_2
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_1
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_0
c  in DIMACS:
-8045  8046 -8047 -656 -8048 0
-8045  8046 -8047 -656 -8049 0
-8045  8046 -8047 -656 -8050 0

c  0+1 --> 1
c    (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧  p_656) -> (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0)
c  in CNF:
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_2
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_1
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨  b^{4, 165}_0
c  in DIMACS:
 8045  8046  8047 -656 -8048 0
 8045  8046  8047 -656 -8049 0
 8045  8046  8047 -656  8050 0

c  1+1 --> 2
c    (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0 ∧  p_656) -> (-b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0)
c  in CNF:
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_2
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨  b^{4, 165}_1
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ -p_656 ∨ -b^{4, 165}_0
c  in DIMACS:
 8045  8046 -8047 -656 -8048 0
 8045  8046 -8047 -656  8049 0
 8045  8046 -8047 -656 -8050 0

c  2+1 --> break 
c    (-b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧  p_656) -> break
c  in CNF:
c     b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 8045 -8046  8047 -656 1162 0


c  2-1 --> 1
c    (-b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧ -p_656) -> (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0)
c  in CNF:
c     b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_2
c     b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_1
c     b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨  b^{4, 165}_0
c  in DIMACS:
 8045 -8046  8047  656 -8048 0
 8045 -8046  8047  656 -8049 0
 8045 -8046  8047  656  8050 0

c  1-1 --> 0
c    (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0 ∧ -p_656) -> (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧ -b^{4, 165}_0)
c  in CNF:
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_2
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_1
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_0
c  in DIMACS:
 8045  8046 -8047  656 -8048 0
 8045  8046 -8047  656 -8049 0
 8045  8046 -8047  656 -8050 0

c  0-1 --> -1
c    (-b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧ -p_656) -> ( b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0)
c  in CNF:
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨  b^{4, 165}_2
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_1
c     b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨  b^{4, 165}_0
c  in DIMACS:
 8045  8046  8047  656  8048 0
 8045  8046  8047  656 -8049 0
 8045  8046  8047  656  8050 0

c  -1-1 --> -2
c    ( b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧  b^{4, 164}_0 ∧ -p_656) -> ( b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0)
c  in CNF:
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨  b^{4, 165}_2
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨  b^{4, 165}_1
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨  p_656 ∨ -b^{4, 165}_0
c  in DIMACS:
-8045  8046 -8047  656  8048 0
-8045  8046 -8047  656  8049 0
-8045  8046 -8047  656 -8050 0

c  -2-1 --> break 
c    ( b^{4, 164}_2 ∧  b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨  b^{4, 164}_0 ∨  p_656 ∨ break
c  in DIMACS:
-8045 -8046  8047  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 164}_2 ∧ -b^{4, 164}_1 ∧ -b^{4, 164}_0 ∧ true) 
c  in CNF:
c    -b^{4, 164}_2 ∨  b^{4, 164}_1 ∨  b^{4, 164}_0 ∨ false 
c  in DIMACS:
-8045  8046  8047  0

c  3 does not represent an automaton state.
c    -(-b^{4, 164}_2 ∧  b^{4, 164}_1 ∧  b^{4, 164}_0 ∧ true) 
c  in CNF:
c     b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ false 
c  in DIMACS:
 8045 -8046 -8047  0
c  -3 does not represent an automaton state.
c    -( b^{4, 164}_2 ∧  b^{4, 164}_1 ∧  b^{4, 164}_0 ∧ true) 
c  in CNF:
c    -b^{4, 164}_2 ∨ -b^{4, 164}_1 ∨ -b^{4, 164}_0 ∨ false 
c  in DIMACS:
-8045 -8046 -8047  0

c i = 165
c  -2+1 --> -1
c    ( b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧  p_660) -> ( b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0)
c  in CNF:
c    -b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨  b^{4, 166}_2
c    -b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_1
c    -b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨  b^{4, 166}_0
c  in DIMACS:
-8048 -8049  8050 -660  8051 0
-8048 -8049  8050 -660 -8052 0
-8048 -8049  8050 -660  8053 0

c  -1+1 --> 0
c    ( b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0 ∧  p_660) -> (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧ -b^{4, 166}_0)
c  in CNF:
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_2
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_1
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_0
c  in DIMACS:
-8048  8049 -8050 -660 -8051 0
-8048  8049 -8050 -660 -8052 0
-8048  8049 -8050 -660 -8053 0

c  0+1 --> 1
c    (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧  p_660) -> (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0)
c  in CNF:
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_2
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_1
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨  b^{4, 166}_0
c  in DIMACS:
 8048  8049  8050 -660 -8051 0
 8048  8049  8050 -660 -8052 0
 8048  8049  8050 -660  8053 0

c  1+1 --> 2
c    (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0 ∧  p_660) -> (-b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0)
c  in CNF:
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_2
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨  b^{4, 166}_1
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ -p_660 ∨ -b^{4, 166}_0
c  in DIMACS:
 8048  8049 -8050 -660 -8051 0
 8048  8049 -8050 -660  8052 0
 8048  8049 -8050 -660 -8053 0

c  2+1 --> break 
c    (-b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧  p_660) -> break
c  in CNF:
c     b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 8048 -8049  8050 -660 1162 0


c  2-1 --> 1
c    (-b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧ -p_660) -> (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0)
c  in CNF:
c     b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_2
c     b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_1
c     b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨  b^{4, 166}_0
c  in DIMACS:
 8048 -8049  8050  660 -8051 0
 8048 -8049  8050  660 -8052 0
 8048 -8049  8050  660  8053 0

c  1-1 --> 0
c    (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0 ∧ -p_660) -> (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧ -b^{4, 166}_0)
c  in CNF:
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_2
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_1
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_0
c  in DIMACS:
 8048  8049 -8050  660 -8051 0
 8048  8049 -8050  660 -8052 0
 8048  8049 -8050  660 -8053 0

c  0-1 --> -1
c    (-b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧ -p_660) -> ( b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0)
c  in CNF:
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨  b^{4, 166}_2
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_1
c     b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨  b^{4, 166}_0
c  in DIMACS:
 8048  8049  8050  660  8051 0
 8048  8049  8050  660 -8052 0
 8048  8049  8050  660  8053 0

c  -1-1 --> -2
c    ( b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧  b^{4, 165}_0 ∧ -p_660) -> ( b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0)
c  in CNF:
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨  b^{4, 166}_2
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨  b^{4, 166}_1
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨  p_660 ∨ -b^{4, 166}_0
c  in DIMACS:
-8048  8049 -8050  660  8051 0
-8048  8049 -8050  660  8052 0
-8048  8049 -8050  660 -8053 0

c  -2-1 --> break 
c    ( b^{4, 165}_2 ∧  b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨  b^{4, 165}_0 ∨  p_660 ∨ break
c  in DIMACS:
-8048 -8049  8050  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 165}_2 ∧ -b^{4, 165}_1 ∧ -b^{4, 165}_0 ∧ true) 
c  in CNF:
c    -b^{4, 165}_2 ∨  b^{4, 165}_1 ∨  b^{4, 165}_0 ∨ false 
c  in DIMACS:
-8048  8049  8050  0

c  3 does not represent an automaton state.
c    -(-b^{4, 165}_2 ∧  b^{4, 165}_1 ∧  b^{4, 165}_0 ∧ true) 
c  in CNF:
c     b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ false 
c  in DIMACS:
 8048 -8049 -8050  0
c  -3 does not represent an automaton state.
c    -( b^{4, 165}_2 ∧  b^{4, 165}_1 ∧  b^{4, 165}_0 ∧ true) 
c  in CNF:
c    -b^{4, 165}_2 ∨ -b^{4, 165}_1 ∨ -b^{4, 165}_0 ∨ false 
c  in DIMACS:
-8048 -8049 -8050  0

c i = 166
c  -2+1 --> -1
c    ( b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧  p_664) -> ( b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0)
c  in CNF:
c    -b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨  b^{4, 167}_2
c    -b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_1
c    -b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨  b^{4, 167}_0
c  in DIMACS:
-8051 -8052  8053 -664  8054 0
-8051 -8052  8053 -664 -8055 0
-8051 -8052  8053 -664  8056 0

c  -1+1 --> 0
c    ( b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0 ∧  p_664) -> (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧ -b^{4, 167}_0)
c  in CNF:
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_2
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_1
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_0
c  in DIMACS:
-8051  8052 -8053 -664 -8054 0
-8051  8052 -8053 -664 -8055 0
-8051  8052 -8053 -664 -8056 0

c  0+1 --> 1
c    (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧  p_664) -> (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0)
c  in CNF:
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_2
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_1
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨  b^{4, 167}_0
c  in DIMACS:
 8051  8052  8053 -664 -8054 0
 8051  8052  8053 -664 -8055 0
 8051  8052  8053 -664  8056 0

c  1+1 --> 2
c    (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0 ∧  p_664) -> (-b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0)
c  in CNF:
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_2
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨  b^{4, 167}_1
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ -p_664 ∨ -b^{4, 167}_0
c  in DIMACS:
 8051  8052 -8053 -664 -8054 0
 8051  8052 -8053 -664  8055 0
 8051  8052 -8053 -664 -8056 0

c  2+1 --> break 
c    (-b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧  p_664) -> break
c  in CNF:
c     b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 8051 -8052  8053 -664 1162 0


c  2-1 --> 1
c    (-b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧ -p_664) -> (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0)
c  in CNF:
c     b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_2
c     b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_1
c     b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨  b^{4, 167}_0
c  in DIMACS:
 8051 -8052  8053  664 -8054 0
 8051 -8052  8053  664 -8055 0
 8051 -8052  8053  664  8056 0

c  1-1 --> 0
c    (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0 ∧ -p_664) -> (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧ -b^{4, 167}_0)
c  in CNF:
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_2
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_1
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_0
c  in DIMACS:
 8051  8052 -8053  664 -8054 0
 8051  8052 -8053  664 -8055 0
 8051  8052 -8053  664 -8056 0

c  0-1 --> -1
c    (-b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧ -p_664) -> ( b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0)
c  in CNF:
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨  b^{4, 167}_2
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_1
c     b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨  b^{4, 167}_0
c  in DIMACS:
 8051  8052  8053  664  8054 0
 8051  8052  8053  664 -8055 0
 8051  8052  8053  664  8056 0

c  -1-1 --> -2
c    ( b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧  b^{4, 166}_0 ∧ -p_664) -> ( b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0)
c  in CNF:
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨  b^{4, 167}_2
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨  b^{4, 167}_1
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨  p_664 ∨ -b^{4, 167}_0
c  in DIMACS:
-8051  8052 -8053  664  8054 0
-8051  8052 -8053  664  8055 0
-8051  8052 -8053  664 -8056 0

c  -2-1 --> break 
c    ( b^{4, 166}_2 ∧  b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨  b^{4, 166}_0 ∨  p_664 ∨ break
c  in DIMACS:
-8051 -8052  8053  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 166}_2 ∧ -b^{4, 166}_1 ∧ -b^{4, 166}_0 ∧ true) 
c  in CNF:
c    -b^{4, 166}_2 ∨  b^{4, 166}_1 ∨  b^{4, 166}_0 ∨ false 
c  in DIMACS:
-8051  8052  8053  0

c  3 does not represent an automaton state.
c    -(-b^{4, 166}_2 ∧  b^{4, 166}_1 ∧  b^{4, 166}_0 ∧ true) 
c  in CNF:
c     b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ false 
c  in DIMACS:
 8051 -8052 -8053  0
c  -3 does not represent an automaton state.
c    -( b^{4, 166}_2 ∧  b^{4, 166}_1 ∧  b^{4, 166}_0 ∧ true) 
c  in CNF:
c    -b^{4, 166}_2 ∨ -b^{4, 166}_1 ∨ -b^{4, 166}_0 ∨ false 
c  in DIMACS:
-8051 -8052 -8053  0

c i = 167
c  -2+1 --> -1
c    ( b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧  p_668) -> ( b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0)
c  in CNF:
c    -b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨  b^{4, 168}_2
c    -b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_1
c    -b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨  b^{4, 168}_0
c  in DIMACS:
-8054 -8055  8056 -668  8057 0
-8054 -8055  8056 -668 -8058 0
-8054 -8055  8056 -668  8059 0

c  -1+1 --> 0
c    ( b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0 ∧  p_668) -> (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧ -b^{4, 168}_0)
c  in CNF:
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_2
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_1
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_0
c  in DIMACS:
-8054  8055 -8056 -668 -8057 0
-8054  8055 -8056 -668 -8058 0
-8054  8055 -8056 -668 -8059 0

c  0+1 --> 1
c    (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧  p_668) -> (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0)
c  in CNF:
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_2
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_1
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨  b^{4, 168}_0
c  in DIMACS:
 8054  8055  8056 -668 -8057 0
 8054  8055  8056 -668 -8058 0
 8054  8055  8056 -668  8059 0

c  1+1 --> 2
c    (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0 ∧  p_668) -> (-b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0)
c  in CNF:
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_2
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨  b^{4, 168}_1
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ -p_668 ∨ -b^{4, 168}_0
c  in DIMACS:
 8054  8055 -8056 -668 -8057 0
 8054  8055 -8056 -668  8058 0
 8054  8055 -8056 -668 -8059 0

c  2+1 --> break 
c    (-b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧  p_668) -> break
c  in CNF:
c     b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ -p_668 ∨ break
c  in DIMACS:
 8054 -8055  8056 -668 1162 0


c  2-1 --> 1
c    (-b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧ -p_668) -> (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0)
c  in CNF:
c     b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_2
c     b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_1
c     b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨  b^{4, 168}_0
c  in DIMACS:
 8054 -8055  8056  668 -8057 0
 8054 -8055  8056  668 -8058 0
 8054 -8055  8056  668  8059 0

c  1-1 --> 0
c    (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0 ∧ -p_668) -> (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧ -b^{4, 168}_0)
c  in CNF:
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_2
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_1
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_0
c  in DIMACS:
 8054  8055 -8056  668 -8057 0
 8054  8055 -8056  668 -8058 0
 8054  8055 -8056  668 -8059 0

c  0-1 --> -1
c    (-b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧ -p_668) -> ( b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0)
c  in CNF:
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨  b^{4, 168}_2
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_1
c     b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨  b^{4, 168}_0
c  in DIMACS:
 8054  8055  8056  668  8057 0
 8054  8055  8056  668 -8058 0
 8054  8055  8056  668  8059 0

c  -1-1 --> -2
c    ( b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧  b^{4, 167}_0 ∧ -p_668) -> ( b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0)
c  in CNF:
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨  b^{4, 168}_2
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨  b^{4, 168}_1
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨  p_668 ∨ -b^{4, 168}_0
c  in DIMACS:
-8054  8055 -8056  668  8057 0
-8054  8055 -8056  668  8058 0
-8054  8055 -8056  668 -8059 0

c  -2-1 --> break 
c    ( b^{4, 167}_2 ∧  b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧ -p_668) -> break
c  in CNF:
c    -b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨  b^{4, 167}_0 ∨  p_668 ∨ break
c  in DIMACS:
-8054 -8055  8056  668 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 167}_2 ∧ -b^{4, 167}_1 ∧ -b^{4, 167}_0 ∧ true) 
c  in CNF:
c    -b^{4, 167}_2 ∨  b^{4, 167}_1 ∨  b^{4, 167}_0 ∨ false 
c  in DIMACS:
-8054  8055  8056  0

c  3 does not represent an automaton state.
c    -(-b^{4, 167}_2 ∧  b^{4, 167}_1 ∧  b^{4, 167}_0 ∧ true) 
c  in CNF:
c     b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ false 
c  in DIMACS:
 8054 -8055 -8056  0
c  -3 does not represent an automaton state.
c    -( b^{4, 167}_2 ∧  b^{4, 167}_1 ∧  b^{4, 167}_0 ∧ true) 
c  in CNF:
c    -b^{4, 167}_2 ∨ -b^{4, 167}_1 ∨ -b^{4, 167}_0 ∨ false 
c  in DIMACS:
-8054 -8055 -8056  0

c i = 168
c  -2+1 --> -1
c    ( b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧  p_672) -> ( b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0)
c  in CNF:
c    -b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨  b^{4, 169}_2
c    -b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_1
c    -b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨  b^{4, 169}_0
c  in DIMACS:
-8057 -8058  8059 -672  8060 0
-8057 -8058  8059 -672 -8061 0
-8057 -8058  8059 -672  8062 0

c  -1+1 --> 0
c    ( b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0 ∧  p_672) -> (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧ -b^{4, 169}_0)
c  in CNF:
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_2
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_1
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_0
c  in DIMACS:
-8057  8058 -8059 -672 -8060 0
-8057  8058 -8059 -672 -8061 0
-8057  8058 -8059 -672 -8062 0

c  0+1 --> 1
c    (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧  p_672) -> (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0)
c  in CNF:
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_2
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_1
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨  b^{4, 169}_0
c  in DIMACS:
 8057  8058  8059 -672 -8060 0
 8057  8058  8059 -672 -8061 0
 8057  8058  8059 -672  8062 0

c  1+1 --> 2
c    (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0 ∧  p_672) -> (-b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0)
c  in CNF:
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_2
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨  b^{4, 169}_1
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ -p_672 ∨ -b^{4, 169}_0
c  in DIMACS:
 8057  8058 -8059 -672 -8060 0
 8057  8058 -8059 -672  8061 0
 8057  8058 -8059 -672 -8062 0

c  2+1 --> break 
c    (-b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧  p_672) -> break
c  in CNF:
c     b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 8057 -8058  8059 -672 1162 0


c  2-1 --> 1
c    (-b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧ -p_672) -> (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0)
c  in CNF:
c     b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_2
c     b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_1
c     b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨  b^{4, 169}_0
c  in DIMACS:
 8057 -8058  8059  672 -8060 0
 8057 -8058  8059  672 -8061 0
 8057 -8058  8059  672  8062 0

c  1-1 --> 0
c    (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0 ∧ -p_672) -> (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧ -b^{4, 169}_0)
c  in CNF:
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_2
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_1
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_0
c  in DIMACS:
 8057  8058 -8059  672 -8060 0
 8057  8058 -8059  672 -8061 0
 8057  8058 -8059  672 -8062 0

c  0-1 --> -1
c    (-b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧ -p_672) -> ( b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0)
c  in CNF:
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨  b^{4, 169}_2
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_1
c     b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨  b^{4, 169}_0
c  in DIMACS:
 8057  8058  8059  672  8060 0
 8057  8058  8059  672 -8061 0
 8057  8058  8059  672  8062 0

c  -1-1 --> -2
c    ( b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧  b^{4, 168}_0 ∧ -p_672) -> ( b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0)
c  in CNF:
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨  b^{4, 169}_2
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨  b^{4, 169}_1
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨  p_672 ∨ -b^{4, 169}_0
c  in DIMACS:
-8057  8058 -8059  672  8060 0
-8057  8058 -8059  672  8061 0
-8057  8058 -8059  672 -8062 0

c  -2-1 --> break 
c    ( b^{4, 168}_2 ∧  b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨  b^{4, 168}_0 ∨  p_672 ∨ break
c  in DIMACS:
-8057 -8058  8059  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 168}_2 ∧ -b^{4, 168}_1 ∧ -b^{4, 168}_0 ∧ true) 
c  in CNF:
c    -b^{4, 168}_2 ∨  b^{4, 168}_1 ∨  b^{4, 168}_0 ∨ false 
c  in DIMACS:
-8057  8058  8059  0

c  3 does not represent an automaton state.
c    -(-b^{4, 168}_2 ∧  b^{4, 168}_1 ∧  b^{4, 168}_0 ∧ true) 
c  in CNF:
c     b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ false 
c  in DIMACS:
 8057 -8058 -8059  0
c  -3 does not represent an automaton state.
c    -( b^{4, 168}_2 ∧  b^{4, 168}_1 ∧  b^{4, 168}_0 ∧ true) 
c  in CNF:
c    -b^{4, 168}_2 ∨ -b^{4, 168}_1 ∨ -b^{4, 168}_0 ∨ false 
c  in DIMACS:
-8057 -8058 -8059  0

c i = 169
c  -2+1 --> -1
c    ( b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧  p_676) -> ( b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0)
c  in CNF:
c    -b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨  b^{4, 170}_2
c    -b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_1
c    -b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨  b^{4, 170}_0
c  in DIMACS:
-8060 -8061  8062 -676  8063 0
-8060 -8061  8062 -676 -8064 0
-8060 -8061  8062 -676  8065 0

c  -1+1 --> 0
c    ( b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0 ∧  p_676) -> (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧ -b^{4, 170}_0)
c  in CNF:
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_2
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_1
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_0
c  in DIMACS:
-8060  8061 -8062 -676 -8063 0
-8060  8061 -8062 -676 -8064 0
-8060  8061 -8062 -676 -8065 0

c  0+1 --> 1
c    (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧  p_676) -> (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0)
c  in CNF:
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_2
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_1
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨  b^{4, 170}_0
c  in DIMACS:
 8060  8061  8062 -676 -8063 0
 8060  8061  8062 -676 -8064 0
 8060  8061  8062 -676  8065 0

c  1+1 --> 2
c    (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0 ∧  p_676) -> (-b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0)
c  in CNF:
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_2
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨  b^{4, 170}_1
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ -p_676 ∨ -b^{4, 170}_0
c  in DIMACS:
 8060  8061 -8062 -676 -8063 0
 8060  8061 -8062 -676  8064 0
 8060  8061 -8062 -676 -8065 0

c  2+1 --> break 
c    (-b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧  p_676) -> break
c  in CNF:
c     b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 8060 -8061  8062 -676 1162 0


c  2-1 --> 1
c    (-b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧ -p_676) -> (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0)
c  in CNF:
c     b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_2
c     b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_1
c     b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨  b^{4, 170}_0
c  in DIMACS:
 8060 -8061  8062  676 -8063 0
 8060 -8061  8062  676 -8064 0
 8060 -8061  8062  676  8065 0

c  1-1 --> 0
c    (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0 ∧ -p_676) -> (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧ -b^{4, 170}_0)
c  in CNF:
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_2
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_1
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_0
c  in DIMACS:
 8060  8061 -8062  676 -8063 0
 8060  8061 -8062  676 -8064 0
 8060  8061 -8062  676 -8065 0

c  0-1 --> -1
c    (-b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧ -p_676) -> ( b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0)
c  in CNF:
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨  b^{4, 170}_2
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_1
c     b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨  b^{4, 170}_0
c  in DIMACS:
 8060  8061  8062  676  8063 0
 8060  8061  8062  676 -8064 0
 8060  8061  8062  676  8065 0

c  -1-1 --> -2
c    ( b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧  b^{4, 169}_0 ∧ -p_676) -> ( b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0)
c  in CNF:
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨  b^{4, 170}_2
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨  b^{4, 170}_1
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨  p_676 ∨ -b^{4, 170}_0
c  in DIMACS:
-8060  8061 -8062  676  8063 0
-8060  8061 -8062  676  8064 0
-8060  8061 -8062  676 -8065 0

c  -2-1 --> break 
c    ( b^{4, 169}_2 ∧  b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨  b^{4, 169}_0 ∨  p_676 ∨ break
c  in DIMACS:
-8060 -8061  8062  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 169}_2 ∧ -b^{4, 169}_1 ∧ -b^{4, 169}_0 ∧ true) 
c  in CNF:
c    -b^{4, 169}_2 ∨  b^{4, 169}_1 ∨  b^{4, 169}_0 ∨ false 
c  in DIMACS:
-8060  8061  8062  0

c  3 does not represent an automaton state.
c    -(-b^{4, 169}_2 ∧  b^{4, 169}_1 ∧  b^{4, 169}_0 ∧ true) 
c  in CNF:
c     b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ false 
c  in DIMACS:
 8060 -8061 -8062  0
c  -3 does not represent an automaton state.
c    -( b^{4, 169}_2 ∧  b^{4, 169}_1 ∧  b^{4, 169}_0 ∧ true) 
c  in CNF:
c    -b^{4, 169}_2 ∨ -b^{4, 169}_1 ∨ -b^{4, 169}_0 ∨ false 
c  in DIMACS:
-8060 -8061 -8062  0

c i = 170
c  -2+1 --> -1
c    ( b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧  p_680) -> ( b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0)
c  in CNF:
c    -b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨  b^{4, 171}_2
c    -b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_1
c    -b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨  b^{4, 171}_0
c  in DIMACS:
-8063 -8064  8065 -680  8066 0
-8063 -8064  8065 -680 -8067 0
-8063 -8064  8065 -680  8068 0

c  -1+1 --> 0
c    ( b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0 ∧  p_680) -> (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧ -b^{4, 171}_0)
c  in CNF:
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_2
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_1
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_0
c  in DIMACS:
-8063  8064 -8065 -680 -8066 0
-8063  8064 -8065 -680 -8067 0
-8063  8064 -8065 -680 -8068 0

c  0+1 --> 1
c    (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧  p_680) -> (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0)
c  in CNF:
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_2
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_1
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨  b^{4, 171}_0
c  in DIMACS:
 8063  8064  8065 -680 -8066 0
 8063  8064  8065 -680 -8067 0
 8063  8064  8065 -680  8068 0

c  1+1 --> 2
c    (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0 ∧  p_680) -> (-b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0)
c  in CNF:
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_2
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨  b^{4, 171}_1
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ -p_680 ∨ -b^{4, 171}_0
c  in DIMACS:
 8063  8064 -8065 -680 -8066 0
 8063  8064 -8065 -680  8067 0
 8063  8064 -8065 -680 -8068 0

c  2+1 --> break 
c    (-b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧  p_680) -> break
c  in CNF:
c     b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 8063 -8064  8065 -680 1162 0


c  2-1 --> 1
c    (-b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧ -p_680) -> (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0)
c  in CNF:
c     b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_2
c     b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_1
c     b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨  b^{4, 171}_0
c  in DIMACS:
 8063 -8064  8065  680 -8066 0
 8063 -8064  8065  680 -8067 0
 8063 -8064  8065  680  8068 0

c  1-1 --> 0
c    (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0 ∧ -p_680) -> (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧ -b^{4, 171}_0)
c  in CNF:
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_2
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_1
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_0
c  in DIMACS:
 8063  8064 -8065  680 -8066 0
 8063  8064 -8065  680 -8067 0
 8063  8064 -8065  680 -8068 0

c  0-1 --> -1
c    (-b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧ -p_680) -> ( b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0)
c  in CNF:
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨  b^{4, 171}_2
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_1
c     b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨  b^{4, 171}_0
c  in DIMACS:
 8063  8064  8065  680  8066 0
 8063  8064  8065  680 -8067 0
 8063  8064  8065  680  8068 0

c  -1-1 --> -2
c    ( b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧  b^{4, 170}_0 ∧ -p_680) -> ( b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0)
c  in CNF:
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨  b^{4, 171}_2
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨  b^{4, 171}_1
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨  p_680 ∨ -b^{4, 171}_0
c  in DIMACS:
-8063  8064 -8065  680  8066 0
-8063  8064 -8065  680  8067 0
-8063  8064 -8065  680 -8068 0

c  -2-1 --> break 
c    ( b^{4, 170}_2 ∧  b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨  b^{4, 170}_0 ∨  p_680 ∨ break
c  in DIMACS:
-8063 -8064  8065  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 170}_2 ∧ -b^{4, 170}_1 ∧ -b^{4, 170}_0 ∧ true) 
c  in CNF:
c    -b^{4, 170}_2 ∨  b^{4, 170}_1 ∨  b^{4, 170}_0 ∨ false 
c  in DIMACS:
-8063  8064  8065  0

c  3 does not represent an automaton state.
c    -(-b^{4, 170}_2 ∧  b^{4, 170}_1 ∧  b^{4, 170}_0 ∧ true) 
c  in CNF:
c     b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ false 
c  in DIMACS:
 8063 -8064 -8065  0
c  -3 does not represent an automaton state.
c    -( b^{4, 170}_2 ∧  b^{4, 170}_1 ∧  b^{4, 170}_0 ∧ true) 
c  in CNF:
c    -b^{4, 170}_2 ∨ -b^{4, 170}_1 ∨ -b^{4, 170}_0 ∨ false 
c  in DIMACS:
-8063 -8064 -8065  0

c i = 171
c  -2+1 --> -1
c    ( b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧  p_684) -> ( b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0)
c  in CNF:
c    -b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨  b^{4, 172}_2
c    -b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_1
c    -b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨  b^{4, 172}_0
c  in DIMACS:
-8066 -8067  8068 -684  8069 0
-8066 -8067  8068 -684 -8070 0
-8066 -8067  8068 -684  8071 0

c  -1+1 --> 0
c    ( b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0 ∧  p_684) -> (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧ -b^{4, 172}_0)
c  in CNF:
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_2
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_1
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_0
c  in DIMACS:
-8066  8067 -8068 -684 -8069 0
-8066  8067 -8068 -684 -8070 0
-8066  8067 -8068 -684 -8071 0

c  0+1 --> 1
c    (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧  p_684) -> (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0)
c  in CNF:
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_2
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_1
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨  b^{4, 172}_0
c  in DIMACS:
 8066  8067  8068 -684 -8069 0
 8066  8067  8068 -684 -8070 0
 8066  8067  8068 -684  8071 0

c  1+1 --> 2
c    (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0 ∧  p_684) -> (-b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0)
c  in CNF:
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_2
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨  b^{4, 172}_1
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ -p_684 ∨ -b^{4, 172}_0
c  in DIMACS:
 8066  8067 -8068 -684 -8069 0
 8066  8067 -8068 -684  8070 0
 8066  8067 -8068 -684 -8071 0

c  2+1 --> break 
c    (-b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧  p_684) -> break
c  in CNF:
c     b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 8066 -8067  8068 -684 1162 0


c  2-1 --> 1
c    (-b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧ -p_684) -> (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0)
c  in CNF:
c     b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_2
c     b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_1
c     b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨  b^{4, 172}_0
c  in DIMACS:
 8066 -8067  8068  684 -8069 0
 8066 -8067  8068  684 -8070 0
 8066 -8067  8068  684  8071 0

c  1-1 --> 0
c    (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0 ∧ -p_684) -> (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧ -b^{4, 172}_0)
c  in CNF:
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_2
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_1
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_0
c  in DIMACS:
 8066  8067 -8068  684 -8069 0
 8066  8067 -8068  684 -8070 0
 8066  8067 -8068  684 -8071 0

c  0-1 --> -1
c    (-b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧ -p_684) -> ( b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0)
c  in CNF:
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨  b^{4, 172}_2
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_1
c     b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨  b^{4, 172}_0
c  in DIMACS:
 8066  8067  8068  684  8069 0
 8066  8067  8068  684 -8070 0
 8066  8067  8068  684  8071 0

c  -1-1 --> -2
c    ( b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧  b^{4, 171}_0 ∧ -p_684) -> ( b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0)
c  in CNF:
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨  b^{4, 172}_2
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨  b^{4, 172}_1
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨  p_684 ∨ -b^{4, 172}_0
c  in DIMACS:
-8066  8067 -8068  684  8069 0
-8066  8067 -8068  684  8070 0
-8066  8067 -8068  684 -8071 0

c  -2-1 --> break 
c    ( b^{4, 171}_2 ∧  b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨  b^{4, 171}_0 ∨  p_684 ∨ break
c  in DIMACS:
-8066 -8067  8068  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 171}_2 ∧ -b^{4, 171}_1 ∧ -b^{4, 171}_0 ∧ true) 
c  in CNF:
c    -b^{4, 171}_2 ∨  b^{4, 171}_1 ∨  b^{4, 171}_0 ∨ false 
c  in DIMACS:
-8066  8067  8068  0

c  3 does not represent an automaton state.
c    -(-b^{4, 171}_2 ∧  b^{4, 171}_1 ∧  b^{4, 171}_0 ∧ true) 
c  in CNF:
c     b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ false 
c  in DIMACS:
 8066 -8067 -8068  0
c  -3 does not represent an automaton state.
c    -( b^{4, 171}_2 ∧  b^{4, 171}_1 ∧  b^{4, 171}_0 ∧ true) 
c  in CNF:
c    -b^{4, 171}_2 ∨ -b^{4, 171}_1 ∨ -b^{4, 171}_0 ∨ false 
c  in DIMACS:
-8066 -8067 -8068  0

c i = 172
c  -2+1 --> -1
c    ( b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧  p_688) -> ( b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0)
c  in CNF:
c    -b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨  b^{4, 173}_2
c    -b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_1
c    -b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨  b^{4, 173}_0
c  in DIMACS:
-8069 -8070  8071 -688  8072 0
-8069 -8070  8071 -688 -8073 0
-8069 -8070  8071 -688  8074 0

c  -1+1 --> 0
c    ( b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0 ∧  p_688) -> (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧ -b^{4, 173}_0)
c  in CNF:
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_2
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_1
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_0
c  in DIMACS:
-8069  8070 -8071 -688 -8072 0
-8069  8070 -8071 -688 -8073 0
-8069  8070 -8071 -688 -8074 0

c  0+1 --> 1
c    (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧  p_688) -> (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0)
c  in CNF:
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_2
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_1
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨  b^{4, 173}_0
c  in DIMACS:
 8069  8070  8071 -688 -8072 0
 8069  8070  8071 -688 -8073 0
 8069  8070  8071 -688  8074 0

c  1+1 --> 2
c    (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0 ∧  p_688) -> (-b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0)
c  in CNF:
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_2
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨  b^{4, 173}_1
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ -p_688 ∨ -b^{4, 173}_0
c  in DIMACS:
 8069  8070 -8071 -688 -8072 0
 8069  8070 -8071 -688  8073 0
 8069  8070 -8071 -688 -8074 0

c  2+1 --> break 
c    (-b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧  p_688) -> break
c  in CNF:
c     b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 8069 -8070  8071 -688 1162 0


c  2-1 --> 1
c    (-b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧ -p_688) -> (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0)
c  in CNF:
c     b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_2
c     b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_1
c     b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨  b^{4, 173}_0
c  in DIMACS:
 8069 -8070  8071  688 -8072 0
 8069 -8070  8071  688 -8073 0
 8069 -8070  8071  688  8074 0

c  1-1 --> 0
c    (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0 ∧ -p_688) -> (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧ -b^{4, 173}_0)
c  in CNF:
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_2
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_1
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_0
c  in DIMACS:
 8069  8070 -8071  688 -8072 0
 8069  8070 -8071  688 -8073 0
 8069  8070 -8071  688 -8074 0

c  0-1 --> -1
c    (-b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧ -p_688) -> ( b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0)
c  in CNF:
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨  b^{4, 173}_2
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_1
c     b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨  b^{4, 173}_0
c  in DIMACS:
 8069  8070  8071  688  8072 0
 8069  8070  8071  688 -8073 0
 8069  8070  8071  688  8074 0

c  -1-1 --> -2
c    ( b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧  b^{4, 172}_0 ∧ -p_688) -> ( b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0)
c  in CNF:
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨  b^{4, 173}_2
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨  b^{4, 173}_1
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨  p_688 ∨ -b^{4, 173}_0
c  in DIMACS:
-8069  8070 -8071  688  8072 0
-8069  8070 -8071  688  8073 0
-8069  8070 -8071  688 -8074 0

c  -2-1 --> break 
c    ( b^{4, 172}_2 ∧  b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨  b^{4, 172}_0 ∨  p_688 ∨ break
c  in DIMACS:
-8069 -8070  8071  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 172}_2 ∧ -b^{4, 172}_1 ∧ -b^{4, 172}_0 ∧ true) 
c  in CNF:
c    -b^{4, 172}_2 ∨  b^{4, 172}_1 ∨  b^{4, 172}_0 ∨ false 
c  in DIMACS:
-8069  8070  8071  0

c  3 does not represent an automaton state.
c    -(-b^{4, 172}_2 ∧  b^{4, 172}_1 ∧  b^{4, 172}_0 ∧ true) 
c  in CNF:
c     b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ false 
c  in DIMACS:
 8069 -8070 -8071  0
c  -3 does not represent an automaton state.
c    -( b^{4, 172}_2 ∧  b^{4, 172}_1 ∧  b^{4, 172}_0 ∧ true) 
c  in CNF:
c    -b^{4, 172}_2 ∨ -b^{4, 172}_1 ∨ -b^{4, 172}_0 ∨ false 
c  in DIMACS:
-8069 -8070 -8071  0

c i = 173
c  -2+1 --> -1
c    ( b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧  p_692) -> ( b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0)
c  in CNF:
c    -b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨  b^{4, 174}_2
c    -b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_1
c    -b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨  b^{4, 174}_0
c  in DIMACS:
-8072 -8073  8074 -692  8075 0
-8072 -8073  8074 -692 -8076 0
-8072 -8073  8074 -692  8077 0

c  -1+1 --> 0
c    ( b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0 ∧  p_692) -> (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧ -b^{4, 174}_0)
c  in CNF:
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_2
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_1
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_0
c  in DIMACS:
-8072  8073 -8074 -692 -8075 0
-8072  8073 -8074 -692 -8076 0
-8072  8073 -8074 -692 -8077 0

c  0+1 --> 1
c    (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧  p_692) -> (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0)
c  in CNF:
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_2
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_1
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨  b^{4, 174}_0
c  in DIMACS:
 8072  8073  8074 -692 -8075 0
 8072  8073  8074 -692 -8076 0
 8072  8073  8074 -692  8077 0

c  1+1 --> 2
c    (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0 ∧  p_692) -> (-b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0)
c  in CNF:
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_2
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨  b^{4, 174}_1
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ -p_692 ∨ -b^{4, 174}_0
c  in DIMACS:
 8072  8073 -8074 -692 -8075 0
 8072  8073 -8074 -692  8076 0
 8072  8073 -8074 -692 -8077 0

c  2+1 --> break 
c    (-b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧  p_692) -> break
c  in CNF:
c     b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ -p_692 ∨ break
c  in DIMACS:
 8072 -8073  8074 -692 1162 0


c  2-1 --> 1
c    (-b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧ -p_692) -> (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0)
c  in CNF:
c     b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_2
c     b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_1
c     b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨  b^{4, 174}_0
c  in DIMACS:
 8072 -8073  8074  692 -8075 0
 8072 -8073  8074  692 -8076 0
 8072 -8073  8074  692  8077 0

c  1-1 --> 0
c    (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0 ∧ -p_692) -> (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧ -b^{4, 174}_0)
c  in CNF:
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_2
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_1
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_0
c  in DIMACS:
 8072  8073 -8074  692 -8075 0
 8072  8073 -8074  692 -8076 0
 8072  8073 -8074  692 -8077 0

c  0-1 --> -1
c    (-b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧ -p_692) -> ( b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0)
c  in CNF:
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨  b^{4, 174}_2
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_1
c     b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨  b^{4, 174}_0
c  in DIMACS:
 8072  8073  8074  692  8075 0
 8072  8073  8074  692 -8076 0
 8072  8073  8074  692  8077 0

c  -1-1 --> -2
c    ( b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧  b^{4, 173}_0 ∧ -p_692) -> ( b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0)
c  in CNF:
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨  b^{4, 174}_2
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨  b^{4, 174}_1
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨  p_692 ∨ -b^{4, 174}_0
c  in DIMACS:
-8072  8073 -8074  692  8075 0
-8072  8073 -8074  692  8076 0
-8072  8073 -8074  692 -8077 0

c  -2-1 --> break 
c    ( b^{4, 173}_2 ∧  b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧ -p_692) -> break
c  in CNF:
c    -b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨  b^{4, 173}_0 ∨  p_692 ∨ break
c  in DIMACS:
-8072 -8073  8074  692 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 173}_2 ∧ -b^{4, 173}_1 ∧ -b^{4, 173}_0 ∧ true) 
c  in CNF:
c    -b^{4, 173}_2 ∨  b^{4, 173}_1 ∨  b^{4, 173}_0 ∨ false 
c  in DIMACS:
-8072  8073  8074  0

c  3 does not represent an automaton state.
c    -(-b^{4, 173}_2 ∧  b^{4, 173}_1 ∧  b^{4, 173}_0 ∧ true) 
c  in CNF:
c     b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ false 
c  in DIMACS:
 8072 -8073 -8074  0
c  -3 does not represent an automaton state.
c    -( b^{4, 173}_2 ∧  b^{4, 173}_1 ∧  b^{4, 173}_0 ∧ true) 
c  in CNF:
c    -b^{4, 173}_2 ∨ -b^{4, 173}_1 ∨ -b^{4, 173}_0 ∨ false 
c  in DIMACS:
-8072 -8073 -8074  0

c i = 174
c  -2+1 --> -1
c    ( b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧  p_696) -> ( b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0)
c  in CNF:
c    -b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨  b^{4, 175}_2
c    -b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_1
c    -b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨  b^{4, 175}_0
c  in DIMACS:
-8075 -8076  8077 -696  8078 0
-8075 -8076  8077 -696 -8079 0
-8075 -8076  8077 -696  8080 0

c  -1+1 --> 0
c    ( b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0 ∧  p_696) -> (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧ -b^{4, 175}_0)
c  in CNF:
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_2
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_1
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_0
c  in DIMACS:
-8075  8076 -8077 -696 -8078 0
-8075  8076 -8077 -696 -8079 0
-8075  8076 -8077 -696 -8080 0

c  0+1 --> 1
c    (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧  p_696) -> (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0)
c  in CNF:
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_2
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_1
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨  b^{4, 175}_0
c  in DIMACS:
 8075  8076  8077 -696 -8078 0
 8075  8076  8077 -696 -8079 0
 8075  8076  8077 -696  8080 0

c  1+1 --> 2
c    (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0 ∧  p_696) -> (-b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0)
c  in CNF:
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_2
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨  b^{4, 175}_1
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ -p_696 ∨ -b^{4, 175}_0
c  in DIMACS:
 8075  8076 -8077 -696 -8078 0
 8075  8076 -8077 -696  8079 0
 8075  8076 -8077 -696 -8080 0

c  2+1 --> break 
c    (-b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧  p_696) -> break
c  in CNF:
c     b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 8075 -8076  8077 -696 1162 0


c  2-1 --> 1
c    (-b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧ -p_696) -> (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0)
c  in CNF:
c     b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_2
c     b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_1
c     b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨  b^{4, 175}_0
c  in DIMACS:
 8075 -8076  8077  696 -8078 0
 8075 -8076  8077  696 -8079 0
 8075 -8076  8077  696  8080 0

c  1-1 --> 0
c    (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0 ∧ -p_696) -> (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧ -b^{4, 175}_0)
c  in CNF:
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_2
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_1
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_0
c  in DIMACS:
 8075  8076 -8077  696 -8078 0
 8075  8076 -8077  696 -8079 0
 8075  8076 -8077  696 -8080 0

c  0-1 --> -1
c    (-b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧ -p_696) -> ( b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0)
c  in CNF:
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨  b^{4, 175}_2
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_1
c     b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨  b^{4, 175}_0
c  in DIMACS:
 8075  8076  8077  696  8078 0
 8075  8076  8077  696 -8079 0
 8075  8076  8077  696  8080 0

c  -1-1 --> -2
c    ( b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧  b^{4, 174}_0 ∧ -p_696) -> ( b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0)
c  in CNF:
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨  b^{4, 175}_2
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨  b^{4, 175}_1
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨  p_696 ∨ -b^{4, 175}_0
c  in DIMACS:
-8075  8076 -8077  696  8078 0
-8075  8076 -8077  696  8079 0
-8075  8076 -8077  696 -8080 0

c  -2-1 --> break 
c    ( b^{4, 174}_2 ∧  b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨  b^{4, 174}_0 ∨  p_696 ∨ break
c  in DIMACS:
-8075 -8076  8077  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 174}_2 ∧ -b^{4, 174}_1 ∧ -b^{4, 174}_0 ∧ true) 
c  in CNF:
c    -b^{4, 174}_2 ∨  b^{4, 174}_1 ∨  b^{4, 174}_0 ∨ false 
c  in DIMACS:
-8075  8076  8077  0

c  3 does not represent an automaton state.
c    -(-b^{4, 174}_2 ∧  b^{4, 174}_1 ∧  b^{4, 174}_0 ∧ true) 
c  in CNF:
c     b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ false 
c  in DIMACS:
 8075 -8076 -8077  0
c  -3 does not represent an automaton state.
c    -( b^{4, 174}_2 ∧  b^{4, 174}_1 ∧  b^{4, 174}_0 ∧ true) 
c  in CNF:
c    -b^{4, 174}_2 ∨ -b^{4, 174}_1 ∨ -b^{4, 174}_0 ∨ false 
c  in DIMACS:
-8075 -8076 -8077  0

c i = 175
c  -2+1 --> -1
c    ( b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧  p_700) -> ( b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0)
c  in CNF:
c    -b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨  b^{4, 176}_2
c    -b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_1
c    -b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨  b^{4, 176}_0
c  in DIMACS:
-8078 -8079  8080 -700  8081 0
-8078 -8079  8080 -700 -8082 0
-8078 -8079  8080 -700  8083 0

c  -1+1 --> 0
c    ( b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0 ∧  p_700) -> (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧ -b^{4, 176}_0)
c  in CNF:
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_2
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_1
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_0
c  in DIMACS:
-8078  8079 -8080 -700 -8081 0
-8078  8079 -8080 -700 -8082 0
-8078  8079 -8080 -700 -8083 0

c  0+1 --> 1
c    (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧  p_700) -> (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0)
c  in CNF:
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_2
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_1
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨  b^{4, 176}_0
c  in DIMACS:
 8078  8079  8080 -700 -8081 0
 8078  8079  8080 -700 -8082 0
 8078  8079  8080 -700  8083 0

c  1+1 --> 2
c    (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0 ∧  p_700) -> (-b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0)
c  in CNF:
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_2
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨  b^{4, 176}_1
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ -p_700 ∨ -b^{4, 176}_0
c  in DIMACS:
 8078  8079 -8080 -700 -8081 0
 8078  8079 -8080 -700  8082 0
 8078  8079 -8080 -700 -8083 0

c  2+1 --> break 
c    (-b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧  p_700) -> break
c  in CNF:
c     b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 8078 -8079  8080 -700 1162 0


c  2-1 --> 1
c    (-b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧ -p_700) -> (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0)
c  in CNF:
c     b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_2
c     b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_1
c     b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨  b^{4, 176}_0
c  in DIMACS:
 8078 -8079  8080  700 -8081 0
 8078 -8079  8080  700 -8082 0
 8078 -8079  8080  700  8083 0

c  1-1 --> 0
c    (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0 ∧ -p_700) -> (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧ -b^{4, 176}_0)
c  in CNF:
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_2
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_1
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_0
c  in DIMACS:
 8078  8079 -8080  700 -8081 0
 8078  8079 -8080  700 -8082 0
 8078  8079 -8080  700 -8083 0

c  0-1 --> -1
c    (-b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧ -p_700) -> ( b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0)
c  in CNF:
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨  b^{4, 176}_2
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_1
c     b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨  b^{4, 176}_0
c  in DIMACS:
 8078  8079  8080  700  8081 0
 8078  8079  8080  700 -8082 0
 8078  8079  8080  700  8083 0

c  -1-1 --> -2
c    ( b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧  b^{4, 175}_0 ∧ -p_700) -> ( b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0)
c  in CNF:
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨  b^{4, 176}_2
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨  b^{4, 176}_1
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨  p_700 ∨ -b^{4, 176}_0
c  in DIMACS:
-8078  8079 -8080  700  8081 0
-8078  8079 -8080  700  8082 0
-8078  8079 -8080  700 -8083 0

c  -2-1 --> break 
c    ( b^{4, 175}_2 ∧  b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨  b^{4, 175}_0 ∨  p_700 ∨ break
c  in DIMACS:
-8078 -8079  8080  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 175}_2 ∧ -b^{4, 175}_1 ∧ -b^{4, 175}_0 ∧ true) 
c  in CNF:
c    -b^{4, 175}_2 ∨  b^{4, 175}_1 ∨  b^{4, 175}_0 ∨ false 
c  in DIMACS:
-8078  8079  8080  0

c  3 does not represent an automaton state.
c    -(-b^{4, 175}_2 ∧  b^{4, 175}_1 ∧  b^{4, 175}_0 ∧ true) 
c  in CNF:
c     b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ false 
c  in DIMACS:
 8078 -8079 -8080  0
c  -3 does not represent an automaton state.
c    -( b^{4, 175}_2 ∧  b^{4, 175}_1 ∧  b^{4, 175}_0 ∧ true) 
c  in CNF:
c    -b^{4, 175}_2 ∨ -b^{4, 175}_1 ∨ -b^{4, 175}_0 ∨ false 
c  in DIMACS:
-8078 -8079 -8080  0

c i = 176
c  -2+1 --> -1
c    ( b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧  p_704) -> ( b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0)
c  in CNF:
c    -b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨  b^{4, 177}_2
c    -b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_1
c    -b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨  b^{4, 177}_0
c  in DIMACS:
-8081 -8082  8083 -704  8084 0
-8081 -8082  8083 -704 -8085 0
-8081 -8082  8083 -704  8086 0

c  -1+1 --> 0
c    ( b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0 ∧  p_704) -> (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧ -b^{4, 177}_0)
c  in CNF:
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_2
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_1
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_0
c  in DIMACS:
-8081  8082 -8083 -704 -8084 0
-8081  8082 -8083 -704 -8085 0
-8081  8082 -8083 -704 -8086 0

c  0+1 --> 1
c    (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧  p_704) -> (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0)
c  in CNF:
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_2
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_1
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨  b^{4, 177}_0
c  in DIMACS:
 8081  8082  8083 -704 -8084 0
 8081  8082  8083 -704 -8085 0
 8081  8082  8083 -704  8086 0

c  1+1 --> 2
c    (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0 ∧  p_704) -> (-b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0)
c  in CNF:
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_2
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨  b^{4, 177}_1
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ -p_704 ∨ -b^{4, 177}_0
c  in DIMACS:
 8081  8082 -8083 -704 -8084 0
 8081  8082 -8083 -704  8085 0
 8081  8082 -8083 -704 -8086 0

c  2+1 --> break 
c    (-b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧  p_704) -> break
c  in CNF:
c     b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 8081 -8082  8083 -704 1162 0


c  2-1 --> 1
c    (-b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧ -p_704) -> (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0)
c  in CNF:
c     b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_2
c     b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_1
c     b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨  b^{4, 177}_0
c  in DIMACS:
 8081 -8082  8083  704 -8084 0
 8081 -8082  8083  704 -8085 0
 8081 -8082  8083  704  8086 0

c  1-1 --> 0
c    (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0 ∧ -p_704) -> (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧ -b^{4, 177}_0)
c  in CNF:
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_2
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_1
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_0
c  in DIMACS:
 8081  8082 -8083  704 -8084 0
 8081  8082 -8083  704 -8085 0
 8081  8082 -8083  704 -8086 0

c  0-1 --> -1
c    (-b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧ -p_704) -> ( b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0)
c  in CNF:
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨  b^{4, 177}_2
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_1
c     b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨  b^{4, 177}_0
c  in DIMACS:
 8081  8082  8083  704  8084 0
 8081  8082  8083  704 -8085 0
 8081  8082  8083  704  8086 0

c  -1-1 --> -2
c    ( b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧  b^{4, 176}_0 ∧ -p_704) -> ( b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0)
c  in CNF:
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨  b^{4, 177}_2
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨  b^{4, 177}_1
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨  p_704 ∨ -b^{4, 177}_0
c  in DIMACS:
-8081  8082 -8083  704  8084 0
-8081  8082 -8083  704  8085 0
-8081  8082 -8083  704 -8086 0

c  -2-1 --> break 
c    ( b^{4, 176}_2 ∧  b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨  b^{4, 176}_0 ∨  p_704 ∨ break
c  in DIMACS:
-8081 -8082  8083  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 176}_2 ∧ -b^{4, 176}_1 ∧ -b^{4, 176}_0 ∧ true) 
c  in CNF:
c    -b^{4, 176}_2 ∨  b^{4, 176}_1 ∨  b^{4, 176}_0 ∨ false 
c  in DIMACS:
-8081  8082  8083  0

c  3 does not represent an automaton state.
c    -(-b^{4, 176}_2 ∧  b^{4, 176}_1 ∧  b^{4, 176}_0 ∧ true) 
c  in CNF:
c     b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ false 
c  in DIMACS:
 8081 -8082 -8083  0
c  -3 does not represent an automaton state.
c    -( b^{4, 176}_2 ∧  b^{4, 176}_1 ∧  b^{4, 176}_0 ∧ true) 
c  in CNF:
c    -b^{4, 176}_2 ∨ -b^{4, 176}_1 ∨ -b^{4, 176}_0 ∨ false 
c  in DIMACS:
-8081 -8082 -8083  0

c i = 177
c  -2+1 --> -1
c    ( b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧  p_708) -> ( b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0)
c  in CNF:
c    -b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨  b^{4, 178}_2
c    -b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_1
c    -b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨  b^{4, 178}_0
c  in DIMACS:
-8084 -8085  8086 -708  8087 0
-8084 -8085  8086 -708 -8088 0
-8084 -8085  8086 -708  8089 0

c  -1+1 --> 0
c    ( b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0 ∧  p_708) -> (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧ -b^{4, 178}_0)
c  in CNF:
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_2
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_1
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_0
c  in DIMACS:
-8084  8085 -8086 -708 -8087 0
-8084  8085 -8086 -708 -8088 0
-8084  8085 -8086 -708 -8089 0

c  0+1 --> 1
c    (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧  p_708) -> (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0)
c  in CNF:
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_2
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_1
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨  b^{4, 178}_0
c  in DIMACS:
 8084  8085  8086 -708 -8087 0
 8084  8085  8086 -708 -8088 0
 8084  8085  8086 -708  8089 0

c  1+1 --> 2
c    (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0 ∧  p_708) -> (-b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0)
c  in CNF:
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_2
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨  b^{4, 178}_1
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ -p_708 ∨ -b^{4, 178}_0
c  in DIMACS:
 8084  8085 -8086 -708 -8087 0
 8084  8085 -8086 -708  8088 0
 8084  8085 -8086 -708 -8089 0

c  2+1 --> break 
c    (-b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧  p_708) -> break
c  in CNF:
c     b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 8084 -8085  8086 -708 1162 0


c  2-1 --> 1
c    (-b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧ -p_708) -> (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0)
c  in CNF:
c     b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_2
c     b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_1
c     b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨  b^{4, 178}_0
c  in DIMACS:
 8084 -8085  8086  708 -8087 0
 8084 -8085  8086  708 -8088 0
 8084 -8085  8086  708  8089 0

c  1-1 --> 0
c    (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0 ∧ -p_708) -> (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧ -b^{4, 178}_0)
c  in CNF:
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_2
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_1
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_0
c  in DIMACS:
 8084  8085 -8086  708 -8087 0
 8084  8085 -8086  708 -8088 0
 8084  8085 -8086  708 -8089 0

c  0-1 --> -1
c    (-b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧ -p_708) -> ( b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0)
c  in CNF:
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨  b^{4, 178}_2
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_1
c     b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨  b^{4, 178}_0
c  in DIMACS:
 8084  8085  8086  708  8087 0
 8084  8085  8086  708 -8088 0
 8084  8085  8086  708  8089 0

c  -1-1 --> -2
c    ( b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧  b^{4, 177}_0 ∧ -p_708) -> ( b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0)
c  in CNF:
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨  b^{4, 178}_2
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨  b^{4, 178}_1
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨  p_708 ∨ -b^{4, 178}_0
c  in DIMACS:
-8084  8085 -8086  708  8087 0
-8084  8085 -8086  708  8088 0
-8084  8085 -8086  708 -8089 0

c  -2-1 --> break 
c    ( b^{4, 177}_2 ∧  b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨  b^{4, 177}_0 ∨  p_708 ∨ break
c  in DIMACS:
-8084 -8085  8086  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 177}_2 ∧ -b^{4, 177}_1 ∧ -b^{4, 177}_0 ∧ true) 
c  in CNF:
c    -b^{4, 177}_2 ∨  b^{4, 177}_1 ∨  b^{4, 177}_0 ∨ false 
c  in DIMACS:
-8084  8085  8086  0

c  3 does not represent an automaton state.
c    -(-b^{4, 177}_2 ∧  b^{4, 177}_1 ∧  b^{4, 177}_0 ∧ true) 
c  in CNF:
c     b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ false 
c  in DIMACS:
 8084 -8085 -8086  0
c  -3 does not represent an automaton state.
c    -( b^{4, 177}_2 ∧  b^{4, 177}_1 ∧  b^{4, 177}_0 ∧ true) 
c  in CNF:
c    -b^{4, 177}_2 ∨ -b^{4, 177}_1 ∨ -b^{4, 177}_0 ∨ false 
c  in DIMACS:
-8084 -8085 -8086  0

c i = 178
c  -2+1 --> -1
c    ( b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧  p_712) -> ( b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0)
c  in CNF:
c    -b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨  b^{4, 179}_2
c    -b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_1
c    -b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨  b^{4, 179}_0
c  in DIMACS:
-8087 -8088  8089 -712  8090 0
-8087 -8088  8089 -712 -8091 0
-8087 -8088  8089 -712  8092 0

c  -1+1 --> 0
c    ( b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0 ∧  p_712) -> (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧ -b^{4, 179}_0)
c  in CNF:
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_2
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_1
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_0
c  in DIMACS:
-8087  8088 -8089 -712 -8090 0
-8087  8088 -8089 -712 -8091 0
-8087  8088 -8089 -712 -8092 0

c  0+1 --> 1
c    (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧  p_712) -> (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0)
c  in CNF:
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_2
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_1
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨  b^{4, 179}_0
c  in DIMACS:
 8087  8088  8089 -712 -8090 0
 8087  8088  8089 -712 -8091 0
 8087  8088  8089 -712  8092 0

c  1+1 --> 2
c    (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0 ∧  p_712) -> (-b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0)
c  in CNF:
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_2
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨  b^{4, 179}_1
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ -p_712 ∨ -b^{4, 179}_0
c  in DIMACS:
 8087  8088 -8089 -712 -8090 0
 8087  8088 -8089 -712  8091 0
 8087  8088 -8089 -712 -8092 0

c  2+1 --> break 
c    (-b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧  p_712) -> break
c  in CNF:
c     b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 8087 -8088  8089 -712 1162 0


c  2-1 --> 1
c    (-b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧ -p_712) -> (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0)
c  in CNF:
c     b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_2
c     b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_1
c     b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨  b^{4, 179}_0
c  in DIMACS:
 8087 -8088  8089  712 -8090 0
 8087 -8088  8089  712 -8091 0
 8087 -8088  8089  712  8092 0

c  1-1 --> 0
c    (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0 ∧ -p_712) -> (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧ -b^{4, 179}_0)
c  in CNF:
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_2
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_1
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_0
c  in DIMACS:
 8087  8088 -8089  712 -8090 0
 8087  8088 -8089  712 -8091 0
 8087  8088 -8089  712 -8092 0

c  0-1 --> -1
c    (-b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧ -p_712) -> ( b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0)
c  in CNF:
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨  b^{4, 179}_2
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_1
c     b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨  b^{4, 179}_0
c  in DIMACS:
 8087  8088  8089  712  8090 0
 8087  8088  8089  712 -8091 0
 8087  8088  8089  712  8092 0

c  -1-1 --> -2
c    ( b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧  b^{4, 178}_0 ∧ -p_712) -> ( b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0)
c  in CNF:
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨  b^{4, 179}_2
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨  b^{4, 179}_1
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨  p_712 ∨ -b^{4, 179}_0
c  in DIMACS:
-8087  8088 -8089  712  8090 0
-8087  8088 -8089  712  8091 0
-8087  8088 -8089  712 -8092 0

c  -2-1 --> break 
c    ( b^{4, 178}_2 ∧  b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨  b^{4, 178}_0 ∨  p_712 ∨ break
c  in DIMACS:
-8087 -8088  8089  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 178}_2 ∧ -b^{4, 178}_1 ∧ -b^{4, 178}_0 ∧ true) 
c  in CNF:
c    -b^{4, 178}_2 ∨  b^{4, 178}_1 ∨  b^{4, 178}_0 ∨ false 
c  in DIMACS:
-8087  8088  8089  0

c  3 does not represent an automaton state.
c    -(-b^{4, 178}_2 ∧  b^{4, 178}_1 ∧  b^{4, 178}_0 ∧ true) 
c  in CNF:
c     b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ false 
c  in DIMACS:
 8087 -8088 -8089  0
c  -3 does not represent an automaton state.
c    -( b^{4, 178}_2 ∧  b^{4, 178}_1 ∧  b^{4, 178}_0 ∧ true) 
c  in CNF:
c    -b^{4, 178}_2 ∨ -b^{4, 178}_1 ∨ -b^{4, 178}_0 ∨ false 
c  in DIMACS:
-8087 -8088 -8089  0

c i = 179
c  -2+1 --> -1
c    ( b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧  p_716) -> ( b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0)
c  in CNF:
c    -b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨  b^{4, 180}_2
c    -b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_1
c    -b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨  b^{4, 180}_0
c  in DIMACS:
-8090 -8091  8092 -716  8093 0
-8090 -8091  8092 -716 -8094 0
-8090 -8091  8092 -716  8095 0

c  -1+1 --> 0
c    ( b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0 ∧  p_716) -> (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧ -b^{4, 180}_0)
c  in CNF:
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_2
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_1
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_0
c  in DIMACS:
-8090  8091 -8092 -716 -8093 0
-8090  8091 -8092 -716 -8094 0
-8090  8091 -8092 -716 -8095 0

c  0+1 --> 1
c    (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧  p_716) -> (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0)
c  in CNF:
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_2
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_1
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨  b^{4, 180}_0
c  in DIMACS:
 8090  8091  8092 -716 -8093 0
 8090  8091  8092 -716 -8094 0
 8090  8091  8092 -716  8095 0

c  1+1 --> 2
c    (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0 ∧  p_716) -> (-b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0)
c  in CNF:
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_2
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨  b^{4, 180}_1
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ -p_716 ∨ -b^{4, 180}_0
c  in DIMACS:
 8090  8091 -8092 -716 -8093 0
 8090  8091 -8092 -716  8094 0
 8090  8091 -8092 -716 -8095 0

c  2+1 --> break 
c    (-b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧  p_716) -> break
c  in CNF:
c     b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ -p_716 ∨ break
c  in DIMACS:
 8090 -8091  8092 -716 1162 0


c  2-1 --> 1
c    (-b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧ -p_716) -> (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0)
c  in CNF:
c     b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_2
c     b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_1
c     b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨  b^{4, 180}_0
c  in DIMACS:
 8090 -8091  8092  716 -8093 0
 8090 -8091  8092  716 -8094 0
 8090 -8091  8092  716  8095 0

c  1-1 --> 0
c    (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0 ∧ -p_716) -> (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧ -b^{4, 180}_0)
c  in CNF:
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_2
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_1
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_0
c  in DIMACS:
 8090  8091 -8092  716 -8093 0
 8090  8091 -8092  716 -8094 0
 8090  8091 -8092  716 -8095 0

c  0-1 --> -1
c    (-b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧ -p_716) -> ( b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0)
c  in CNF:
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨  b^{4, 180}_2
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_1
c     b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨  b^{4, 180}_0
c  in DIMACS:
 8090  8091  8092  716  8093 0
 8090  8091  8092  716 -8094 0
 8090  8091  8092  716  8095 0

c  -1-1 --> -2
c    ( b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧  b^{4, 179}_0 ∧ -p_716) -> ( b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0)
c  in CNF:
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨  b^{4, 180}_2
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨  b^{4, 180}_1
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨  p_716 ∨ -b^{4, 180}_0
c  in DIMACS:
-8090  8091 -8092  716  8093 0
-8090  8091 -8092  716  8094 0
-8090  8091 -8092  716 -8095 0

c  -2-1 --> break 
c    ( b^{4, 179}_2 ∧  b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧ -p_716) -> break
c  in CNF:
c    -b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨  b^{4, 179}_0 ∨  p_716 ∨ break
c  in DIMACS:
-8090 -8091  8092  716 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 179}_2 ∧ -b^{4, 179}_1 ∧ -b^{4, 179}_0 ∧ true) 
c  in CNF:
c    -b^{4, 179}_2 ∨  b^{4, 179}_1 ∨  b^{4, 179}_0 ∨ false 
c  in DIMACS:
-8090  8091  8092  0

c  3 does not represent an automaton state.
c    -(-b^{4, 179}_2 ∧  b^{4, 179}_1 ∧  b^{4, 179}_0 ∧ true) 
c  in CNF:
c     b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ false 
c  in DIMACS:
 8090 -8091 -8092  0
c  -3 does not represent an automaton state.
c    -( b^{4, 179}_2 ∧  b^{4, 179}_1 ∧  b^{4, 179}_0 ∧ true) 
c  in CNF:
c    -b^{4, 179}_2 ∨ -b^{4, 179}_1 ∨ -b^{4, 179}_0 ∨ false 
c  in DIMACS:
-8090 -8091 -8092  0

c i = 180
c  -2+1 --> -1
c    ( b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧  p_720) -> ( b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0)
c  in CNF:
c    -b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨  b^{4, 181}_2
c    -b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_1
c    -b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨  b^{4, 181}_0
c  in DIMACS:
-8093 -8094  8095 -720  8096 0
-8093 -8094  8095 -720 -8097 0
-8093 -8094  8095 -720  8098 0

c  -1+1 --> 0
c    ( b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0 ∧  p_720) -> (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧ -b^{4, 181}_0)
c  in CNF:
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_2
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_1
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_0
c  in DIMACS:
-8093  8094 -8095 -720 -8096 0
-8093  8094 -8095 -720 -8097 0
-8093  8094 -8095 -720 -8098 0

c  0+1 --> 1
c    (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧  p_720) -> (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0)
c  in CNF:
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_2
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_1
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨  b^{4, 181}_0
c  in DIMACS:
 8093  8094  8095 -720 -8096 0
 8093  8094  8095 -720 -8097 0
 8093  8094  8095 -720  8098 0

c  1+1 --> 2
c    (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0 ∧  p_720) -> (-b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0)
c  in CNF:
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_2
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨  b^{4, 181}_1
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ -p_720 ∨ -b^{4, 181}_0
c  in DIMACS:
 8093  8094 -8095 -720 -8096 0
 8093  8094 -8095 -720  8097 0
 8093  8094 -8095 -720 -8098 0

c  2+1 --> break 
c    (-b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧  p_720) -> break
c  in CNF:
c     b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 8093 -8094  8095 -720 1162 0


c  2-1 --> 1
c    (-b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧ -p_720) -> (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0)
c  in CNF:
c     b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_2
c     b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_1
c     b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨  b^{4, 181}_0
c  in DIMACS:
 8093 -8094  8095  720 -8096 0
 8093 -8094  8095  720 -8097 0
 8093 -8094  8095  720  8098 0

c  1-1 --> 0
c    (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0 ∧ -p_720) -> (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧ -b^{4, 181}_0)
c  in CNF:
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_2
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_1
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_0
c  in DIMACS:
 8093  8094 -8095  720 -8096 0
 8093  8094 -8095  720 -8097 0
 8093  8094 -8095  720 -8098 0

c  0-1 --> -1
c    (-b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧ -p_720) -> ( b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0)
c  in CNF:
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨  b^{4, 181}_2
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_1
c     b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨  b^{4, 181}_0
c  in DIMACS:
 8093  8094  8095  720  8096 0
 8093  8094  8095  720 -8097 0
 8093  8094  8095  720  8098 0

c  -1-1 --> -2
c    ( b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧  b^{4, 180}_0 ∧ -p_720) -> ( b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0)
c  in CNF:
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨  b^{4, 181}_2
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨  b^{4, 181}_1
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨  p_720 ∨ -b^{4, 181}_0
c  in DIMACS:
-8093  8094 -8095  720  8096 0
-8093  8094 -8095  720  8097 0
-8093  8094 -8095  720 -8098 0

c  -2-1 --> break 
c    ( b^{4, 180}_2 ∧  b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨  b^{4, 180}_0 ∨  p_720 ∨ break
c  in DIMACS:
-8093 -8094  8095  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 180}_2 ∧ -b^{4, 180}_1 ∧ -b^{4, 180}_0 ∧ true) 
c  in CNF:
c    -b^{4, 180}_2 ∨  b^{4, 180}_1 ∨  b^{4, 180}_0 ∨ false 
c  in DIMACS:
-8093  8094  8095  0

c  3 does not represent an automaton state.
c    -(-b^{4, 180}_2 ∧  b^{4, 180}_1 ∧  b^{4, 180}_0 ∧ true) 
c  in CNF:
c     b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ false 
c  in DIMACS:
 8093 -8094 -8095  0
c  -3 does not represent an automaton state.
c    -( b^{4, 180}_2 ∧  b^{4, 180}_1 ∧  b^{4, 180}_0 ∧ true) 
c  in CNF:
c    -b^{4, 180}_2 ∨ -b^{4, 180}_1 ∨ -b^{4, 180}_0 ∨ false 
c  in DIMACS:
-8093 -8094 -8095  0

c i = 181
c  -2+1 --> -1
c    ( b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧  p_724) -> ( b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0)
c  in CNF:
c    -b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨  b^{4, 182}_2
c    -b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_1
c    -b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨  b^{4, 182}_0
c  in DIMACS:
-8096 -8097  8098 -724  8099 0
-8096 -8097  8098 -724 -8100 0
-8096 -8097  8098 -724  8101 0

c  -1+1 --> 0
c    ( b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0 ∧  p_724) -> (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧ -b^{4, 182}_0)
c  in CNF:
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_2
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_1
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_0
c  in DIMACS:
-8096  8097 -8098 -724 -8099 0
-8096  8097 -8098 -724 -8100 0
-8096  8097 -8098 -724 -8101 0

c  0+1 --> 1
c    (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧  p_724) -> (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0)
c  in CNF:
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_2
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_1
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨  b^{4, 182}_0
c  in DIMACS:
 8096  8097  8098 -724 -8099 0
 8096  8097  8098 -724 -8100 0
 8096  8097  8098 -724  8101 0

c  1+1 --> 2
c    (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0 ∧  p_724) -> (-b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0)
c  in CNF:
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_2
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨  b^{4, 182}_1
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ -p_724 ∨ -b^{4, 182}_0
c  in DIMACS:
 8096  8097 -8098 -724 -8099 0
 8096  8097 -8098 -724  8100 0
 8096  8097 -8098 -724 -8101 0

c  2+1 --> break 
c    (-b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧  p_724) -> break
c  in CNF:
c     b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ -p_724 ∨ break
c  in DIMACS:
 8096 -8097  8098 -724 1162 0


c  2-1 --> 1
c    (-b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧ -p_724) -> (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0)
c  in CNF:
c     b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_2
c     b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_1
c     b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨  b^{4, 182}_0
c  in DIMACS:
 8096 -8097  8098  724 -8099 0
 8096 -8097  8098  724 -8100 0
 8096 -8097  8098  724  8101 0

c  1-1 --> 0
c    (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0 ∧ -p_724) -> (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧ -b^{4, 182}_0)
c  in CNF:
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_2
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_1
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_0
c  in DIMACS:
 8096  8097 -8098  724 -8099 0
 8096  8097 -8098  724 -8100 0
 8096  8097 -8098  724 -8101 0

c  0-1 --> -1
c    (-b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧ -p_724) -> ( b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0)
c  in CNF:
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨  b^{4, 182}_2
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_1
c     b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨  b^{4, 182}_0
c  in DIMACS:
 8096  8097  8098  724  8099 0
 8096  8097  8098  724 -8100 0
 8096  8097  8098  724  8101 0

c  -1-1 --> -2
c    ( b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧  b^{4, 181}_0 ∧ -p_724) -> ( b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0)
c  in CNF:
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨  b^{4, 182}_2
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨  b^{4, 182}_1
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨  p_724 ∨ -b^{4, 182}_0
c  in DIMACS:
-8096  8097 -8098  724  8099 0
-8096  8097 -8098  724  8100 0
-8096  8097 -8098  724 -8101 0

c  -2-1 --> break 
c    ( b^{4, 181}_2 ∧  b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧ -p_724) -> break
c  in CNF:
c    -b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨  b^{4, 181}_0 ∨  p_724 ∨ break
c  in DIMACS:
-8096 -8097  8098  724 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 181}_2 ∧ -b^{4, 181}_1 ∧ -b^{4, 181}_0 ∧ true) 
c  in CNF:
c    -b^{4, 181}_2 ∨  b^{4, 181}_1 ∨  b^{4, 181}_0 ∨ false 
c  in DIMACS:
-8096  8097  8098  0

c  3 does not represent an automaton state.
c    -(-b^{4, 181}_2 ∧  b^{4, 181}_1 ∧  b^{4, 181}_0 ∧ true) 
c  in CNF:
c     b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ false 
c  in DIMACS:
 8096 -8097 -8098  0
c  -3 does not represent an automaton state.
c    -( b^{4, 181}_2 ∧  b^{4, 181}_1 ∧  b^{4, 181}_0 ∧ true) 
c  in CNF:
c    -b^{4, 181}_2 ∨ -b^{4, 181}_1 ∨ -b^{4, 181}_0 ∨ false 
c  in DIMACS:
-8096 -8097 -8098  0

c i = 182
c  -2+1 --> -1
c    ( b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧  p_728) -> ( b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0)
c  in CNF:
c    -b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨  b^{4, 183}_2
c    -b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_1
c    -b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨  b^{4, 183}_0
c  in DIMACS:
-8099 -8100  8101 -728  8102 0
-8099 -8100  8101 -728 -8103 0
-8099 -8100  8101 -728  8104 0

c  -1+1 --> 0
c    ( b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0 ∧  p_728) -> (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧ -b^{4, 183}_0)
c  in CNF:
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_2
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_1
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_0
c  in DIMACS:
-8099  8100 -8101 -728 -8102 0
-8099  8100 -8101 -728 -8103 0
-8099  8100 -8101 -728 -8104 0

c  0+1 --> 1
c    (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧  p_728) -> (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0)
c  in CNF:
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_2
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_1
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨  b^{4, 183}_0
c  in DIMACS:
 8099  8100  8101 -728 -8102 0
 8099  8100  8101 -728 -8103 0
 8099  8100  8101 -728  8104 0

c  1+1 --> 2
c    (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0 ∧  p_728) -> (-b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0)
c  in CNF:
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_2
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨  b^{4, 183}_1
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ -p_728 ∨ -b^{4, 183}_0
c  in DIMACS:
 8099  8100 -8101 -728 -8102 0
 8099  8100 -8101 -728  8103 0
 8099  8100 -8101 -728 -8104 0

c  2+1 --> break 
c    (-b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧  p_728) -> break
c  in CNF:
c     b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 8099 -8100  8101 -728 1162 0


c  2-1 --> 1
c    (-b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧ -p_728) -> (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0)
c  in CNF:
c     b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_2
c     b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_1
c     b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨  b^{4, 183}_0
c  in DIMACS:
 8099 -8100  8101  728 -8102 0
 8099 -8100  8101  728 -8103 0
 8099 -8100  8101  728  8104 0

c  1-1 --> 0
c    (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0 ∧ -p_728) -> (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧ -b^{4, 183}_0)
c  in CNF:
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_2
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_1
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_0
c  in DIMACS:
 8099  8100 -8101  728 -8102 0
 8099  8100 -8101  728 -8103 0
 8099  8100 -8101  728 -8104 0

c  0-1 --> -1
c    (-b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧ -p_728) -> ( b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0)
c  in CNF:
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨  b^{4, 183}_2
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_1
c     b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨  b^{4, 183}_0
c  in DIMACS:
 8099  8100  8101  728  8102 0
 8099  8100  8101  728 -8103 0
 8099  8100  8101  728  8104 0

c  -1-1 --> -2
c    ( b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧  b^{4, 182}_0 ∧ -p_728) -> ( b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0)
c  in CNF:
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨  b^{4, 183}_2
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨  b^{4, 183}_1
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨  p_728 ∨ -b^{4, 183}_0
c  in DIMACS:
-8099  8100 -8101  728  8102 0
-8099  8100 -8101  728  8103 0
-8099  8100 -8101  728 -8104 0

c  -2-1 --> break 
c    ( b^{4, 182}_2 ∧  b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨  b^{4, 182}_0 ∨  p_728 ∨ break
c  in DIMACS:
-8099 -8100  8101  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 182}_2 ∧ -b^{4, 182}_1 ∧ -b^{4, 182}_0 ∧ true) 
c  in CNF:
c    -b^{4, 182}_2 ∨  b^{4, 182}_1 ∨  b^{4, 182}_0 ∨ false 
c  in DIMACS:
-8099  8100  8101  0

c  3 does not represent an automaton state.
c    -(-b^{4, 182}_2 ∧  b^{4, 182}_1 ∧  b^{4, 182}_0 ∧ true) 
c  in CNF:
c     b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ false 
c  in DIMACS:
 8099 -8100 -8101  0
c  -3 does not represent an automaton state.
c    -( b^{4, 182}_2 ∧  b^{4, 182}_1 ∧  b^{4, 182}_0 ∧ true) 
c  in CNF:
c    -b^{4, 182}_2 ∨ -b^{4, 182}_1 ∨ -b^{4, 182}_0 ∨ false 
c  in DIMACS:
-8099 -8100 -8101  0

c i = 183
c  -2+1 --> -1
c    ( b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧  p_732) -> ( b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0)
c  in CNF:
c    -b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨  b^{4, 184}_2
c    -b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_1
c    -b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨  b^{4, 184}_0
c  in DIMACS:
-8102 -8103  8104 -732  8105 0
-8102 -8103  8104 -732 -8106 0
-8102 -8103  8104 -732  8107 0

c  -1+1 --> 0
c    ( b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0 ∧  p_732) -> (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧ -b^{4, 184}_0)
c  in CNF:
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_2
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_1
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_0
c  in DIMACS:
-8102  8103 -8104 -732 -8105 0
-8102  8103 -8104 -732 -8106 0
-8102  8103 -8104 -732 -8107 0

c  0+1 --> 1
c    (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧  p_732) -> (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0)
c  in CNF:
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_2
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_1
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨  b^{4, 184}_0
c  in DIMACS:
 8102  8103  8104 -732 -8105 0
 8102  8103  8104 -732 -8106 0
 8102  8103  8104 -732  8107 0

c  1+1 --> 2
c    (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0 ∧  p_732) -> (-b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0)
c  in CNF:
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_2
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨  b^{4, 184}_1
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ -p_732 ∨ -b^{4, 184}_0
c  in DIMACS:
 8102  8103 -8104 -732 -8105 0
 8102  8103 -8104 -732  8106 0
 8102  8103 -8104 -732 -8107 0

c  2+1 --> break 
c    (-b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧  p_732) -> break
c  in CNF:
c     b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 8102 -8103  8104 -732 1162 0


c  2-1 --> 1
c    (-b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧ -p_732) -> (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0)
c  in CNF:
c     b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_2
c     b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_1
c     b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨  b^{4, 184}_0
c  in DIMACS:
 8102 -8103  8104  732 -8105 0
 8102 -8103  8104  732 -8106 0
 8102 -8103  8104  732  8107 0

c  1-1 --> 0
c    (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0 ∧ -p_732) -> (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧ -b^{4, 184}_0)
c  in CNF:
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_2
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_1
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_0
c  in DIMACS:
 8102  8103 -8104  732 -8105 0
 8102  8103 -8104  732 -8106 0
 8102  8103 -8104  732 -8107 0

c  0-1 --> -1
c    (-b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧ -p_732) -> ( b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0)
c  in CNF:
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨  b^{4, 184}_2
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_1
c     b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨  b^{4, 184}_0
c  in DIMACS:
 8102  8103  8104  732  8105 0
 8102  8103  8104  732 -8106 0
 8102  8103  8104  732  8107 0

c  -1-1 --> -2
c    ( b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧  b^{4, 183}_0 ∧ -p_732) -> ( b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0)
c  in CNF:
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨  b^{4, 184}_2
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨  b^{4, 184}_1
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨  p_732 ∨ -b^{4, 184}_0
c  in DIMACS:
-8102  8103 -8104  732  8105 0
-8102  8103 -8104  732  8106 0
-8102  8103 -8104  732 -8107 0

c  -2-1 --> break 
c    ( b^{4, 183}_2 ∧  b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨  b^{4, 183}_0 ∨  p_732 ∨ break
c  in DIMACS:
-8102 -8103  8104  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 183}_2 ∧ -b^{4, 183}_1 ∧ -b^{4, 183}_0 ∧ true) 
c  in CNF:
c    -b^{4, 183}_2 ∨  b^{4, 183}_1 ∨  b^{4, 183}_0 ∨ false 
c  in DIMACS:
-8102  8103  8104  0

c  3 does not represent an automaton state.
c    -(-b^{4, 183}_2 ∧  b^{4, 183}_1 ∧  b^{4, 183}_0 ∧ true) 
c  in CNF:
c     b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ false 
c  in DIMACS:
 8102 -8103 -8104  0
c  -3 does not represent an automaton state.
c    -( b^{4, 183}_2 ∧  b^{4, 183}_1 ∧  b^{4, 183}_0 ∧ true) 
c  in CNF:
c    -b^{4, 183}_2 ∨ -b^{4, 183}_1 ∨ -b^{4, 183}_0 ∨ false 
c  in DIMACS:
-8102 -8103 -8104  0

c i = 184
c  -2+1 --> -1
c    ( b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧  p_736) -> ( b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0)
c  in CNF:
c    -b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨  b^{4, 185}_2
c    -b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_1
c    -b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨  b^{4, 185}_0
c  in DIMACS:
-8105 -8106  8107 -736  8108 0
-8105 -8106  8107 -736 -8109 0
-8105 -8106  8107 -736  8110 0

c  -1+1 --> 0
c    ( b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0 ∧  p_736) -> (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧ -b^{4, 185}_0)
c  in CNF:
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_2
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_1
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_0
c  in DIMACS:
-8105  8106 -8107 -736 -8108 0
-8105  8106 -8107 -736 -8109 0
-8105  8106 -8107 -736 -8110 0

c  0+1 --> 1
c    (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧  p_736) -> (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0)
c  in CNF:
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_2
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_1
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨  b^{4, 185}_0
c  in DIMACS:
 8105  8106  8107 -736 -8108 0
 8105  8106  8107 -736 -8109 0
 8105  8106  8107 -736  8110 0

c  1+1 --> 2
c    (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0 ∧  p_736) -> (-b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0)
c  in CNF:
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_2
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨  b^{4, 185}_1
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ -p_736 ∨ -b^{4, 185}_0
c  in DIMACS:
 8105  8106 -8107 -736 -8108 0
 8105  8106 -8107 -736  8109 0
 8105  8106 -8107 -736 -8110 0

c  2+1 --> break 
c    (-b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧  p_736) -> break
c  in CNF:
c     b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 8105 -8106  8107 -736 1162 0


c  2-1 --> 1
c    (-b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧ -p_736) -> (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0)
c  in CNF:
c     b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_2
c     b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_1
c     b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨  b^{4, 185}_0
c  in DIMACS:
 8105 -8106  8107  736 -8108 0
 8105 -8106  8107  736 -8109 0
 8105 -8106  8107  736  8110 0

c  1-1 --> 0
c    (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0 ∧ -p_736) -> (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧ -b^{4, 185}_0)
c  in CNF:
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_2
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_1
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_0
c  in DIMACS:
 8105  8106 -8107  736 -8108 0
 8105  8106 -8107  736 -8109 0
 8105  8106 -8107  736 -8110 0

c  0-1 --> -1
c    (-b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧ -p_736) -> ( b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0)
c  in CNF:
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨  b^{4, 185}_2
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_1
c     b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨  b^{4, 185}_0
c  in DIMACS:
 8105  8106  8107  736  8108 0
 8105  8106  8107  736 -8109 0
 8105  8106  8107  736  8110 0

c  -1-1 --> -2
c    ( b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧  b^{4, 184}_0 ∧ -p_736) -> ( b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0)
c  in CNF:
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨  b^{4, 185}_2
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨  b^{4, 185}_1
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨  p_736 ∨ -b^{4, 185}_0
c  in DIMACS:
-8105  8106 -8107  736  8108 0
-8105  8106 -8107  736  8109 0
-8105  8106 -8107  736 -8110 0

c  -2-1 --> break 
c    ( b^{4, 184}_2 ∧  b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨  b^{4, 184}_0 ∨  p_736 ∨ break
c  in DIMACS:
-8105 -8106  8107  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 184}_2 ∧ -b^{4, 184}_1 ∧ -b^{4, 184}_0 ∧ true) 
c  in CNF:
c    -b^{4, 184}_2 ∨  b^{4, 184}_1 ∨  b^{4, 184}_0 ∨ false 
c  in DIMACS:
-8105  8106  8107  0

c  3 does not represent an automaton state.
c    -(-b^{4, 184}_2 ∧  b^{4, 184}_1 ∧  b^{4, 184}_0 ∧ true) 
c  in CNF:
c     b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ false 
c  in DIMACS:
 8105 -8106 -8107  0
c  -3 does not represent an automaton state.
c    -( b^{4, 184}_2 ∧  b^{4, 184}_1 ∧  b^{4, 184}_0 ∧ true) 
c  in CNF:
c    -b^{4, 184}_2 ∨ -b^{4, 184}_1 ∨ -b^{4, 184}_0 ∨ false 
c  in DIMACS:
-8105 -8106 -8107  0

c i = 185
c  -2+1 --> -1
c    ( b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧  p_740) -> ( b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0)
c  in CNF:
c    -b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨  b^{4, 186}_2
c    -b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_1
c    -b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨  b^{4, 186}_0
c  in DIMACS:
-8108 -8109  8110 -740  8111 0
-8108 -8109  8110 -740 -8112 0
-8108 -8109  8110 -740  8113 0

c  -1+1 --> 0
c    ( b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0 ∧  p_740) -> (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧ -b^{4, 186}_0)
c  in CNF:
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_2
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_1
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_0
c  in DIMACS:
-8108  8109 -8110 -740 -8111 0
-8108  8109 -8110 -740 -8112 0
-8108  8109 -8110 -740 -8113 0

c  0+1 --> 1
c    (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧  p_740) -> (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0)
c  in CNF:
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_2
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_1
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨  b^{4, 186}_0
c  in DIMACS:
 8108  8109  8110 -740 -8111 0
 8108  8109  8110 -740 -8112 0
 8108  8109  8110 -740  8113 0

c  1+1 --> 2
c    (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0 ∧  p_740) -> (-b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0)
c  in CNF:
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_2
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨  b^{4, 186}_1
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ -p_740 ∨ -b^{4, 186}_0
c  in DIMACS:
 8108  8109 -8110 -740 -8111 0
 8108  8109 -8110 -740  8112 0
 8108  8109 -8110 -740 -8113 0

c  2+1 --> break 
c    (-b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧  p_740) -> break
c  in CNF:
c     b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 8108 -8109  8110 -740 1162 0


c  2-1 --> 1
c    (-b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧ -p_740) -> (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0)
c  in CNF:
c     b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_2
c     b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_1
c     b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨  b^{4, 186}_0
c  in DIMACS:
 8108 -8109  8110  740 -8111 0
 8108 -8109  8110  740 -8112 0
 8108 -8109  8110  740  8113 0

c  1-1 --> 0
c    (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0 ∧ -p_740) -> (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧ -b^{4, 186}_0)
c  in CNF:
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_2
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_1
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_0
c  in DIMACS:
 8108  8109 -8110  740 -8111 0
 8108  8109 -8110  740 -8112 0
 8108  8109 -8110  740 -8113 0

c  0-1 --> -1
c    (-b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧ -p_740) -> ( b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0)
c  in CNF:
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨  b^{4, 186}_2
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_1
c     b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨  b^{4, 186}_0
c  in DIMACS:
 8108  8109  8110  740  8111 0
 8108  8109  8110  740 -8112 0
 8108  8109  8110  740  8113 0

c  -1-1 --> -2
c    ( b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧  b^{4, 185}_0 ∧ -p_740) -> ( b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0)
c  in CNF:
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨  b^{4, 186}_2
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨  b^{4, 186}_1
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨  p_740 ∨ -b^{4, 186}_0
c  in DIMACS:
-8108  8109 -8110  740  8111 0
-8108  8109 -8110  740  8112 0
-8108  8109 -8110  740 -8113 0

c  -2-1 --> break 
c    ( b^{4, 185}_2 ∧  b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨  b^{4, 185}_0 ∨  p_740 ∨ break
c  in DIMACS:
-8108 -8109  8110  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 185}_2 ∧ -b^{4, 185}_1 ∧ -b^{4, 185}_0 ∧ true) 
c  in CNF:
c    -b^{4, 185}_2 ∨  b^{4, 185}_1 ∨  b^{4, 185}_0 ∨ false 
c  in DIMACS:
-8108  8109  8110  0

c  3 does not represent an automaton state.
c    -(-b^{4, 185}_2 ∧  b^{4, 185}_1 ∧  b^{4, 185}_0 ∧ true) 
c  in CNF:
c     b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ false 
c  in DIMACS:
 8108 -8109 -8110  0
c  -3 does not represent an automaton state.
c    -( b^{4, 185}_2 ∧  b^{4, 185}_1 ∧  b^{4, 185}_0 ∧ true) 
c  in CNF:
c    -b^{4, 185}_2 ∨ -b^{4, 185}_1 ∨ -b^{4, 185}_0 ∨ false 
c  in DIMACS:
-8108 -8109 -8110  0

c i = 186
c  -2+1 --> -1
c    ( b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧  p_744) -> ( b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0)
c  in CNF:
c    -b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨  b^{4, 187}_2
c    -b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_1
c    -b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨  b^{4, 187}_0
c  in DIMACS:
-8111 -8112  8113 -744  8114 0
-8111 -8112  8113 -744 -8115 0
-8111 -8112  8113 -744  8116 0

c  -1+1 --> 0
c    ( b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0 ∧  p_744) -> (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧ -b^{4, 187}_0)
c  in CNF:
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_2
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_1
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_0
c  in DIMACS:
-8111  8112 -8113 -744 -8114 0
-8111  8112 -8113 -744 -8115 0
-8111  8112 -8113 -744 -8116 0

c  0+1 --> 1
c    (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧  p_744) -> (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0)
c  in CNF:
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_2
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_1
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨  b^{4, 187}_0
c  in DIMACS:
 8111  8112  8113 -744 -8114 0
 8111  8112  8113 -744 -8115 0
 8111  8112  8113 -744  8116 0

c  1+1 --> 2
c    (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0 ∧  p_744) -> (-b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0)
c  in CNF:
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_2
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨  b^{4, 187}_1
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ -p_744 ∨ -b^{4, 187}_0
c  in DIMACS:
 8111  8112 -8113 -744 -8114 0
 8111  8112 -8113 -744  8115 0
 8111  8112 -8113 -744 -8116 0

c  2+1 --> break 
c    (-b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧  p_744) -> break
c  in CNF:
c     b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 8111 -8112  8113 -744 1162 0


c  2-1 --> 1
c    (-b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧ -p_744) -> (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0)
c  in CNF:
c     b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_2
c     b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_1
c     b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨  b^{4, 187}_0
c  in DIMACS:
 8111 -8112  8113  744 -8114 0
 8111 -8112  8113  744 -8115 0
 8111 -8112  8113  744  8116 0

c  1-1 --> 0
c    (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0 ∧ -p_744) -> (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧ -b^{4, 187}_0)
c  in CNF:
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_2
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_1
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_0
c  in DIMACS:
 8111  8112 -8113  744 -8114 0
 8111  8112 -8113  744 -8115 0
 8111  8112 -8113  744 -8116 0

c  0-1 --> -1
c    (-b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧ -p_744) -> ( b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0)
c  in CNF:
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨  b^{4, 187}_2
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_1
c     b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨  b^{4, 187}_0
c  in DIMACS:
 8111  8112  8113  744  8114 0
 8111  8112  8113  744 -8115 0
 8111  8112  8113  744  8116 0

c  -1-1 --> -2
c    ( b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧  b^{4, 186}_0 ∧ -p_744) -> ( b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0)
c  in CNF:
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨  b^{4, 187}_2
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨  b^{4, 187}_1
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨  p_744 ∨ -b^{4, 187}_0
c  in DIMACS:
-8111  8112 -8113  744  8114 0
-8111  8112 -8113  744  8115 0
-8111  8112 -8113  744 -8116 0

c  -2-1 --> break 
c    ( b^{4, 186}_2 ∧  b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨  b^{4, 186}_0 ∨  p_744 ∨ break
c  in DIMACS:
-8111 -8112  8113  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 186}_2 ∧ -b^{4, 186}_1 ∧ -b^{4, 186}_0 ∧ true) 
c  in CNF:
c    -b^{4, 186}_2 ∨  b^{4, 186}_1 ∨  b^{4, 186}_0 ∨ false 
c  in DIMACS:
-8111  8112  8113  0

c  3 does not represent an automaton state.
c    -(-b^{4, 186}_2 ∧  b^{4, 186}_1 ∧  b^{4, 186}_0 ∧ true) 
c  in CNF:
c     b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ false 
c  in DIMACS:
 8111 -8112 -8113  0
c  -3 does not represent an automaton state.
c    -( b^{4, 186}_2 ∧  b^{4, 186}_1 ∧  b^{4, 186}_0 ∧ true) 
c  in CNF:
c    -b^{4, 186}_2 ∨ -b^{4, 186}_1 ∨ -b^{4, 186}_0 ∨ false 
c  in DIMACS:
-8111 -8112 -8113  0

c i = 187
c  -2+1 --> -1
c    ( b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧  p_748) -> ( b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0)
c  in CNF:
c    -b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨  b^{4, 188}_2
c    -b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_1
c    -b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨  b^{4, 188}_0
c  in DIMACS:
-8114 -8115  8116 -748  8117 0
-8114 -8115  8116 -748 -8118 0
-8114 -8115  8116 -748  8119 0

c  -1+1 --> 0
c    ( b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0 ∧  p_748) -> (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧ -b^{4, 188}_0)
c  in CNF:
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_2
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_1
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_0
c  in DIMACS:
-8114  8115 -8116 -748 -8117 0
-8114  8115 -8116 -748 -8118 0
-8114  8115 -8116 -748 -8119 0

c  0+1 --> 1
c    (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧  p_748) -> (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0)
c  in CNF:
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_2
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_1
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨  b^{4, 188}_0
c  in DIMACS:
 8114  8115  8116 -748 -8117 0
 8114  8115  8116 -748 -8118 0
 8114  8115  8116 -748  8119 0

c  1+1 --> 2
c    (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0 ∧  p_748) -> (-b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0)
c  in CNF:
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_2
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨  b^{4, 188}_1
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ -p_748 ∨ -b^{4, 188}_0
c  in DIMACS:
 8114  8115 -8116 -748 -8117 0
 8114  8115 -8116 -748  8118 0
 8114  8115 -8116 -748 -8119 0

c  2+1 --> break 
c    (-b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧  p_748) -> break
c  in CNF:
c     b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 8114 -8115  8116 -748 1162 0


c  2-1 --> 1
c    (-b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧ -p_748) -> (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0)
c  in CNF:
c     b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_2
c     b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_1
c     b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨  b^{4, 188}_0
c  in DIMACS:
 8114 -8115  8116  748 -8117 0
 8114 -8115  8116  748 -8118 0
 8114 -8115  8116  748  8119 0

c  1-1 --> 0
c    (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0 ∧ -p_748) -> (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧ -b^{4, 188}_0)
c  in CNF:
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_2
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_1
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_0
c  in DIMACS:
 8114  8115 -8116  748 -8117 0
 8114  8115 -8116  748 -8118 0
 8114  8115 -8116  748 -8119 0

c  0-1 --> -1
c    (-b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧ -p_748) -> ( b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0)
c  in CNF:
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨  b^{4, 188}_2
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_1
c     b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨  b^{4, 188}_0
c  in DIMACS:
 8114  8115  8116  748  8117 0
 8114  8115  8116  748 -8118 0
 8114  8115  8116  748  8119 0

c  -1-1 --> -2
c    ( b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧  b^{4, 187}_0 ∧ -p_748) -> ( b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0)
c  in CNF:
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨  b^{4, 188}_2
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨  b^{4, 188}_1
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨  p_748 ∨ -b^{4, 188}_0
c  in DIMACS:
-8114  8115 -8116  748  8117 0
-8114  8115 -8116  748  8118 0
-8114  8115 -8116  748 -8119 0

c  -2-1 --> break 
c    ( b^{4, 187}_2 ∧  b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨  b^{4, 187}_0 ∨  p_748 ∨ break
c  in DIMACS:
-8114 -8115  8116  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 187}_2 ∧ -b^{4, 187}_1 ∧ -b^{4, 187}_0 ∧ true) 
c  in CNF:
c    -b^{4, 187}_2 ∨  b^{4, 187}_1 ∨  b^{4, 187}_0 ∨ false 
c  in DIMACS:
-8114  8115  8116  0

c  3 does not represent an automaton state.
c    -(-b^{4, 187}_2 ∧  b^{4, 187}_1 ∧  b^{4, 187}_0 ∧ true) 
c  in CNF:
c     b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ false 
c  in DIMACS:
 8114 -8115 -8116  0
c  -3 does not represent an automaton state.
c    -( b^{4, 187}_2 ∧  b^{4, 187}_1 ∧  b^{4, 187}_0 ∧ true) 
c  in CNF:
c    -b^{4, 187}_2 ∨ -b^{4, 187}_1 ∨ -b^{4, 187}_0 ∨ false 
c  in DIMACS:
-8114 -8115 -8116  0

c i = 188
c  -2+1 --> -1
c    ( b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧  p_752) -> ( b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0)
c  in CNF:
c    -b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨  b^{4, 189}_2
c    -b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_1
c    -b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨  b^{4, 189}_0
c  in DIMACS:
-8117 -8118  8119 -752  8120 0
-8117 -8118  8119 -752 -8121 0
-8117 -8118  8119 -752  8122 0

c  -1+1 --> 0
c    ( b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0 ∧  p_752) -> (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧ -b^{4, 189}_0)
c  in CNF:
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_2
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_1
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_0
c  in DIMACS:
-8117  8118 -8119 -752 -8120 0
-8117  8118 -8119 -752 -8121 0
-8117  8118 -8119 -752 -8122 0

c  0+1 --> 1
c    (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧  p_752) -> (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0)
c  in CNF:
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_2
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_1
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨  b^{4, 189}_0
c  in DIMACS:
 8117  8118  8119 -752 -8120 0
 8117  8118  8119 -752 -8121 0
 8117  8118  8119 -752  8122 0

c  1+1 --> 2
c    (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0 ∧  p_752) -> (-b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0)
c  in CNF:
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_2
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨  b^{4, 189}_1
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ -p_752 ∨ -b^{4, 189}_0
c  in DIMACS:
 8117  8118 -8119 -752 -8120 0
 8117  8118 -8119 -752  8121 0
 8117  8118 -8119 -752 -8122 0

c  2+1 --> break 
c    (-b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧  p_752) -> break
c  in CNF:
c     b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 8117 -8118  8119 -752 1162 0


c  2-1 --> 1
c    (-b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧ -p_752) -> (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0)
c  in CNF:
c     b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_2
c     b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_1
c     b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨  b^{4, 189}_0
c  in DIMACS:
 8117 -8118  8119  752 -8120 0
 8117 -8118  8119  752 -8121 0
 8117 -8118  8119  752  8122 0

c  1-1 --> 0
c    (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0 ∧ -p_752) -> (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧ -b^{4, 189}_0)
c  in CNF:
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_2
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_1
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_0
c  in DIMACS:
 8117  8118 -8119  752 -8120 0
 8117  8118 -8119  752 -8121 0
 8117  8118 -8119  752 -8122 0

c  0-1 --> -1
c    (-b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧ -p_752) -> ( b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0)
c  in CNF:
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨  b^{4, 189}_2
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_1
c     b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨  b^{4, 189}_0
c  in DIMACS:
 8117  8118  8119  752  8120 0
 8117  8118  8119  752 -8121 0
 8117  8118  8119  752  8122 0

c  -1-1 --> -2
c    ( b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧  b^{4, 188}_0 ∧ -p_752) -> ( b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0)
c  in CNF:
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨  b^{4, 189}_2
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨  b^{4, 189}_1
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨  p_752 ∨ -b^{4, 189}_0
c  in DIMACS:
-8117  8118 -8119  752  8120 0
-8117  8118 -8119  752  8121 0
-8117  8118 -8119  752 -8122 0

c  -2-1 --> break 
c    ( b^{4, 188}_2 ∧  b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨  b^{4, 188}_0 ∨  p_752 ∨ break
c  in DIMACS:
-8117 -8118  8119  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 188}_2 ∧ -b^{4, 188}_1 ∧ -b^{4, 188}_0 ∧ true) 
c  in CNF:
c    -b^{4, 188}_2 ∨  b^{4, 188}_1 ∨  b^{4, 188}_0 ∨ false 
c  in DIMACS:
-8117  8118  8119  0

c  3 does not represent an automaton state.
c    -(-b^{4, 188}_2 ∧  b^{4, 188}_1 ∧  b^{4, 188}_0 ∧ true) 
c  in CNF:
c     b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ false 
c  in DIMACS:
 8117 -8118 -8119  0
c  -3 does not represent an automaton state.
c    -( b^{4, 188}_2 ∧  b^{4, 188}_1 ∧  b^{4, 188}_0 ∧ true) 
c  in CNF:
c    -b^{4, 188}_2 ∨ -b^{4, 188}_1 ∨ -b^{4, 188}_0 ∨ false 
c  in DIMACS:
-8117 -8118 -8119  0

c i = 189
c  -2+1 --> -1
c    ( b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧  p_756) -> ( b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0)
c  in CNF:
c    -b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨  b^{4, 190}_2
c    -b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_1
c    -b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨  b^{4, 190}_0
c  in DIMACS:
-8120 -8121  8122 -756  8123 0
-8120 -8121  8122 -756 -8124 0
-8120 -8121  8122 -756  8125 0

c  -1+1 --> 0
c    ( b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0 ∧  p_756) -> (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧ -b^{4, 190}_0)
c  in CNF:
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_2
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_1
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_0
c  in DIMACS:
-8120  8121 -8122 -756 -8123 0
-8120  8121 -8122 -756 -8124 0
-8120  8121 -8122 -756 -8125 0

c  0+1 --> 1
c    (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧  p_756) -> (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0)
c  in CNF:
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_2
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_1
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨  b^{4, 190}_0
c  in DIMACS:
 8120  8121  8122 -756 -8123 0
 8120  8121  8122 -756 -8124 0
 8120  8121  8122 -756  8125 0

c  1+1 --> 2
c    (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0 ∧  p_756) -> (-b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0)
c  in CNF:
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_2
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨  b^{4, 190}_1
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ -p_756 ∨ -b^{4, 190}_0
c  in DIMACS:
 8120  8121 -8122 -756 -8123 0
 8120  8121 -8122 -756  8124 0
 8120  8121 -8122 -756 -8125 0

c  2+1 --> break 
c    (-b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧  p_756) -> break
c  in CNF:
c     b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 8120 -8121  8122 -756 1162 0


c  2-1 --> 1
c    (-b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧ -p_756) -> (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0)
c  in CNF:
c     b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_2
c     b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_1
c     b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨  b^{4, 190}_0
c  in DIMACS:
 8120 -8121  8122  756 -8123 0
 8120 -8121  8122  756 -8124 0
 8120 -8121  8122  756  8125 0

c  1-1 --> 0
c    (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0 ∧ -p_756) -> (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧ -b^{4, 190}_0)
c  in CNF:
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_2
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_1
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_0
c  in DIMACS:
 8120  8121 -8122  756 -8123 0
 8120  8121 -8122  756 -8124 0
 8120  8121 -8122  756 -8125 0

c  0-1 --> -1
c    (-b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧ -p_756) -> ( b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0)
c  in CNF:
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨  b^{4, 190}_2
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_1
c     b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨  b^{4, 190}_0
c  in DIMACS:
 8120  8121  8122  756  8123 0
 8120  8121  8122  756 -8124 0
 8120  8121  8122  756  8125 0

c  -1-1 --> -2
c    ( b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧  b^{4, 189}_0 ∧ -p_756) -> ( b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0)
c  in CNF:
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨  b^{4, 190}_2
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨  b^{4, 190}_1
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨  p_756 ∨ -b^{4, 190}_0
c  in DIMACS:
-8120  8121 -8122  756  8123 0
-8120  8121 -8122  756  8124 0
-8120  8121 -8122  756 -8125 0

c  -2-1 --> break 
c    ( b^{4, 189}_2 ∧  b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨  b^{4, 189}_0 ∨  p_756 ∨ break
c  in DIMACS:
-8120 -8121  8122  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 189}_2 ∧ -b^{4, 189}_1 ∧ -b^{4, 189}_0 ∧ true) 
c  in CNF:
c    -b^{4, 189}_2 ∨  b^{4, 189}_1 ∨  b^{4, 189}_0 ∨ false 
c  in DIMACS:
-8120  8121  8122  0

c  3 does not represent an automaton state.
c    -(-b^{4, 189}_2 ∧  b^{4, 189}_1 ∧  b^{4, 189}_0 ∧ true) 
c  in CNF:
c     b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ false 
c  in DIMACS:
 8120 -8121 -8122  0
c  -3 does not represent an automaton state.
c    -( b^{4, 189}_2 ∧  b^{4, 189}_1 ∧  b^{4, 189}_0 ∧ true) 
c  in CNF:
c    -b^{4, 189}_2 ∨ -b^{4, 189}_1 ∨ -b^{4, 189}_0 ∨ false 
c  in DIMACS:
-8120 -8121 -8122  0

c i = 190
c  -2+1 --> -1
c    ( b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧  p_760) -> ( b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0)
c  in CNF:
c    -b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨  b^{4, 191}_2
c    -b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_1
c    -b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨  b^{4, 191}_0
c  in DIMACS:
-8123 -8124  8125 -760  8126 0
-8123 -8124  8125 -760 -8127 0
-8123 -8124  8125 -760  8128 0

c  -1+1 --> 0
c    ( b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0 ∧  p_760) -> (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧ -b^{4, 191}_0)
c  in CNF:
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_2
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_1
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_0
c  in DIMACS:
-8123  8124 -8125 -760 -8126 0
-8123  8124 -8125 -760 -8127 0
-8123  8124 -8125 -760 -8128 0

c  0+1 --> 1
c    (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧  p_760) -> (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0)
c  in CNF:
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_2
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_1
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨  b^{4, 191}_0
c  in DIMACS:
 8123  8124  8125 -760 -8126 0
 8123  8124  8125 -760 -8127 0
 8123  8124  8125 -760  8128 0

c  1+1 --> 2
c    (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0 ∧  p_760) -> (-b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0)
c  in CNF:
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_2
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨  b^{4, 191}_1
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ -p_760 ∨ -b^{4, 191}_0
c  in DIMACS:
 8123  8124 -8125 -760 -8126 0
 8123  8124 -8125 -760  8127 0
 8123  8124 -8125 -760 -8128 0

c  2+1 --> break 
c    (-b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧  p_760) -> break
c  in CNF:
c     b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 8123 -8124  8125 -760 1162 0


c  2-1 --> 1
c    (-b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧ -p_760) -> (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0)
c  in CNF:
c     b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_2
c     b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_1
c     b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨  b^{4, 191}_0
c  in DIMACS:
 8123 -8124  8125  760 -8126 0
 8123 -8124  8125  760 -8127 0
 8123 -8124  8125  760  8128 0

c  1-1 --> 0
c    (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0 ∧ -p_760) -> (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧ -b^{4, 191}_0)
c  in CNF:
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_2
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_1
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_0
c  in DIMACS:
 8123  8124 -8125  760 -8126 0
 8123  8124 -8125  760 -8127 0
 8123  8124 -8125  760 -8128 0

c  0-1 --> -1
c    (-b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧ -p_760) -> ( b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0)
c  in CNF:
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨  b^{4, 191}_2
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_1
c     b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨  b^{4, 191}_0
c  in DIMACS:
 8123  8124  8125  760  8126 0
 8123  8124  8125  760 -8127 0
 8123  8124  8125  760  8128 0

c  -1-1 --> -2
c    ( b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧  b^{4, 190}_0 ∧ -p_760) -> ( b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0)
c  in CNF:
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨  b^{4, 191}_2
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨  b^{4, 191}_1
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨  p_760 ∨ -b^{4, 191}_0
c  in DIMACS:
-8123  8124 -8125  760  8126 0
-8123  8124 -8125  760  8127 0
-8123  8124 -8125  760 -8128 0

c  -2-1 --> break 
c    ( b^{4, 190}_2 ∧  b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨  b^{4, 190}_0 ∨  p_760 ∨ break
c  in DIMACS:
-8123 -8124  8125  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 190}_2 ∧ -b^{4, 190}_1 ∧ -b^{4, 190}_0 ∧ true) 
c  in CNF:
c    -b^{4, 190}_2 ∨  b^{4, 190}_1 ∨  b^{4, 190}_0 ∨ false 
c  in DIMACS:
-8123  8124  8125  0

c  3 does not represent an automaton state.
c    -(-b^{4, 190}_2 ∧  b^{4, 190}_1 ∧  b^{4, 190}_0 ∧ true) 
c  in CNF:
c     b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ false 
c  in DIMACS:
 8123 -8124 -8125  0
c  -3 does not represent an automaton state.
c    -( b^{4, 190}_2 ∧  b^{4, 190}_1 ∧  b^{4, 190}_0 ∧ true) 
c  in CNF:
c    -b^{4, 190}_2 ∨ -b^{4, 190}_1 ∨ -b^{4, 190}_0 ∨ false 
c  in DIMACS:
-8123 -8124 -8125  0

c i = 191
c  -2+1 --> -1
c    ( b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧  p_764) -> ( b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0)
c  in CNF:
c    -b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨  b^{4, 192}_2
c    -b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_1
c    -b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨  b^{4, 192}_0
c  in DIMACS:
-8126 -8127  8128 -764  8129 0
-8126 -8127  8128 -764 -8130 0
-8126 -8127  8128 -764  8131 0

c  -1+1 --> 0
c    ( b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0 ∧  p_764) -> (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧ -b^{4, 192}_0)
c  in CNF:
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_2
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_1
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_0
c  in DIMACS:
-8126  8127 -8128 -764 -8129 0
-8126  8127 -8128 -764 -8130 0
-8126  8127 -8128 -764 -8131 0

c  0+1 --> 1
c    (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧  p_764) -> (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0)
c  in CNF:
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_2
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_1
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨  b^{4, 192}_0
c  in DIMACS:
 8126  8127  8128 -764 -8129 0
 8126  8127  8128 -764 -8130 0
 8126  8127  8128 -764  8131 0

c  1+1 --> 2
c    (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0 ∧  p_764) -> (-b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0)
c  in CNF:
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_2
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨  b^{4, 192}_1
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ -p_764 ∨ -b^{4, 192}_0
c  in DIMACS:
 8126  8127 -8128 -764 -8129 0
 8126  8127 -8128 -764  8130 0
 8126  8127 -8128 -764 -8131 0

c  2+1 --> break 
c    (-b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧  p_764) -> break
c  in CNF:
c     b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ -p_764 ∨ break
c  in DIMACS:
 8126 -8127  8128 -764 1162 0


c  2-1 --> 1
c    (-b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧ -p_764) -> (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0)
c  in CNF:
c     b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_2
c     b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_1
c     b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨  b^{4, 192}_0
c  in DIMACS:
 8126 -8127  8128  764 -8129 0
 8126 -8127  8128  764 -8130 0
 8126 -8127  8128  764  8131 0

c  1-1 --> 0
c    (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0 ∧ -p_764) -> (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧ -b^{4, 192}_0)
c  in CNF:
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_2
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_1
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_0
c  in DIMACS:
 8126  8127 -8128  764 -8129 0
 8126  8127 -8128  764 -8130 0
 8126  8127 -8128  764 -8131 0

c  0-1 --> -1
c    (-b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧ -p_764) -> ( b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0)
c  in CNF:
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨  b^{4, 192}_2
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_1
c     b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨  b^{4, 192}_0
c  in DIMACS:
 8126  8127  8128  764  8129 0
 8126  8127  8128  764 -8130 0
 8126  8127  8128  764  8131 0

c  -1-1 --> -2
c    ( b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧  b^{4, 191}_0 ∧ -p_764) -> ( b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0)
c  in CNF:
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨  b^{4, 192}_2
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨  b^{4, 192}_1
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨  p_764 ∨ -b^{4, 192}_0
c  in DIMACS:
-8126  8127 -8128  764  8129 0
-8126  8127 -8128  764  8130 0
-8126  8127 -8128  764 -8131 0

c  -2-1 --> break 
c    ( b^{4, 191}_2 ∧  b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧ -p_764) -> break
c  in CNF:
c    -b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨  b^{4, 191}_0 ∨  p_764 ∨ break
c  in DIMACS:
-8126 -8127  8128  764 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 191}_2 ∧ -b^{4, 191}_1 ∧ -b^{4, 191}_0 ∧ true) 
c  in CNF:
c    -b^{4, 191}_2 ∨  b^{4, 191}_1 ∨  b^{4, 191}_0 ∨ false 
c  in DIMACS:
-8126  8127  8128  0

c  3 does not represent an automaton state.
c    -(-b^{4, 191}_2 ∧  b^{4, 191}_1 ∧  b^{4, 191}_0 ∧ true) 
c  in CNF:
c     b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ false 
c  in DIMACS:
 8126 -8127 -8128  0
c  -3 does not represent an automaton state.
c    -( b^{4, 191}_2 ∧  b^{4, 191}_1 ∧  b^{4, 191}_0 ∧ true) 
c  in CNF:
c    -b^{4, 191}_2 ∨ -b^{4, 191}_1 ∨ -b^{4, 191}_0 ∨ false 
c  in DIMACS:
-8126 -8127 -8128  0

c i = 192
c  -2+1 --> -1
c    ( b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧  p_768) -> ( b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0)
c  in CNF:
c    -b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨  b^{4, 193}_2
c    -b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_1
c    -b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨  b^{4, 193}_0
c  in DIMACS:
-8129 -8130  8131 -768  8132 0
-8129 -8130  8131 -768 -8133 0
-8129 -8130  8131 -768  8134 0

c  -1+1 --> 0
c    ( b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0 ∧  p_768) -> (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧ -b^{4, 193}_0)
c  in CNF:
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_2
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_1
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_0
c  in DIMACS:
-8129  8130 -8131 -768 -8132 0
-8129  8130 -8131 -768 -8133 0
-8129  8130 -8131 -768 -8134 0

c  0+1 --> 1
c    (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧  p_768) -> (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0)
c  in CNF:
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_2
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_1
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨  b^{4, 193}_0
c  in DIMACS:
 8129  8130  8131 -768 -8132 0
 8129  8130  8131 -768 -8133 0
 8129  8130  8131 -768  8134 0

c  1+1 --> 2
c    (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0 ∧  p_768) -> (-b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0)
c  in CNF:
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_2
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨  b^{4, 193}_1
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ -p_768 ∨ -b^{4, 193}_0
c  in DIMACS:
 8129  8130 -8131 -768 -8132 0
 8129  8130 -8131 -768  8133 0
 8129  8130 -8131 -768 -8134 0

c  2+1 --> break 
c    (-b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧  p_768) -> break
c  in CNF:
c     b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 8129 -8130  8131 -768 1162 0


c  2-1 --> 1
c    (-b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧ -p_768) -> (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0)
c  in CNF:
c     b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_2
c     b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_1
c     b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨  b^{4, 193}_0
c  in DIMACS:
 8129 -8130  8131  768 -8132 0
 8129 -8130  8131  768 -8133 0
 8129 -8130  8131  768  8134 0

c  1-1 --> 0
c    (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0 ∧ -p_768) -> (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧ -b^{4, 193}_0)
c  in CNF:
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_2
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_1
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_0
c  in DIMACS:
 8129  8130 -8131  768 -8132 0
 8129  8130 -8131  768 -8133 0
 8129  8130 -8131  768 -8134 0

c  0-1 --> -1
c    (-b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧ -p_768) -> ( b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0)
c  in CNF:
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨  b^{4, 193}_2
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_1
c     b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨  b^{4, 193}_0
c  in DIMACS:
 8129  8130  8131  768  8132 0
 8129  8130  8131  768 -8133 0
 8129  8130  8131  768  8134 0

c  -1-1 --> -2
c    ( b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧  b^{4, 192}_0 ∧ -p_768) -> ( b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0)
c  in CNF:
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨  b^{4, 193}_2
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨  b^{4, 193}_1
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨  p_768 ∨ -b^{4, 193}_0
c  in DIMACS:
-8129  8130 -8131  768  8132 0
-8129  8130 -8131  768  8133 0
-8129  8130 -8131  768 -8134 0

c  -2-1 --> break 
c    ( b^{4, 192}_2 ∧  b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨  b^{4, 192}_0 ∨  p_768 ∨ break
c  in DIMACS:
-8129 -8130  8131  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 192}_2 ∧ -b^{4, 192}_1 ∧ -b^{4, 192}_0 ∧ true) 
c  in CNF:
c    -b^{4, 192}_2 ∨  b^{4, 192}_1 ∨  b^{4, 192}_0 ∨ false 
c  in DIMACS:
-8129  8130  8131  0

c  3 does not represent an automaton state.
c    -(-b^{4, 192}_2 ∧  b^{4, 192}_1 ∧  b^{4, 192}_0 ∧ true) 
c  in CNF:
c     b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ false 
c  in DIMACS:
 8129 -8130 -8131  0
c  -3 does not represent an automaton state.
c    -( b^{4, 192}_2 ∧  b^{4, 192}_1 ∧  b^{4, 192}_0 ∧ true) 
c  in CNF:
c    -b^{4, 192}_2 ∨ -b^{4, 192}_1 ∨ -b^{4, 192}_0 ∨ false 
c  in DIMACS:
-8129 -8130 -8131  0

c i = 193
c  -2+1 --> -1
c    ( b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧  p_772) -> ( b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0)
c  in CNF:
c    -b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨  b^{4, 194}_2
c    -b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_1
c    -b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨  b^{4, 194}_0
c  in DIMACS:
-8132 -8133  8134 -772  8135 0
-8132 -8133  8134 -772 -8136 0
-8132 -8133  8134 -772  8137 0

c  -1+1 --> 0
c    ( b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0 ∧  p_772) -> (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧ -b^{4, 194}_0)
c  in CNF:
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_2
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_1
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_0
c  in DIMACS:
-8132  8133 -8134 -772 -8135 0
-8132  8133 -8134 -772 -8136 0
-8132  8133 -8134 -772 -8137 0

c  0+1 --> 1
c    (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧  p_772) -> (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0)
c  in CNF:
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_2
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_1
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨  b^{4, 194}_0
c  in DIMACS:
 8132  8133  8134 -772 -8135 0
 8132  8133  8134 -772 -8136 0
 8132  8133  8134 -772  8137 0

c  1+1 --> 2
c    (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0 ∧  p_772) -> (-b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0)
c  in CNF:
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_2
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨  b^{4, 194}_1
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ -p_772 ∨ -b^{4, 194}_0
c  in DIMACS:
 8132  8133 -8134 -772 -8135 0
 8132  8133 -8134 -772  8136 0
 8132  8133 -8134 -772 -8137 0

c  2+1 --> break 
c    (-b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧  p_772) -> break
c  in CNF:
c     b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ -p_772 ∨ break
c  in DIMACS:
 8132 -8133  8134 -772 1162 0


c  2-1 --> 1
c    (-b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧ -p_772) -> (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0)
c  in CNF:
c     b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_2
c     b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_1
c     b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨  b^{4, 194}_0
c  in DIMACS:
 8132 -8133  8134  772 -8135 0
 8132 -8133  8134  772 -8136 0
 8132 -8133  8134  772  8137 0

c  1-1 --> 0
c    (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0 ∧ -p_772) -> (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧ -b^{4, 194}_0)
c  in CNF:
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_2
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_1
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_0
c  in DIMACS:
 8132  8133 -8134  772 -8135 0
 8132  8133 -8134  772 -8136 0
 8132  8133 -8134  772 -8137 0

c  0-1 --> -1
c    (-b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧ -p_772) -> ( b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0)
c  in CNF:
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨  b^{4, 194}_2
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_1
c     b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨  b^{4, 194}_0
c  in DIMACS:
 8132  8133  8134  772  8135 0
 8132  8133  8134  772 -8136 0
 8132  8133  8134  772  8137 0

c  -1-1 --> -2
c    ( b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧  b^{4, 193}_0 ∧ -p_772) -> ( b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0)
c  in CNF:
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨  b^{4, 194}_2
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨  b^{4, 194}_1
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨  p_772 ∨ -b^{4, 194}_0
c  in DIMACS:
-8132  8133 -8134  772  8135 0
-8132  8133 -8134  772  8136 0
-8132  8133 -8134  772 -8137 0

c  -2-1 --> break 
c    ( b^{4, 193}_2 ∧  b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧ -p_772) -> break
c  in CNF:
c    -b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨  b^{4, 193}_0 ∨  p_772 ∨ break
c  in DIMACS:
-8132 -8133  8134  772 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 193}_2 ∧ -b^{4, 193}_1 ∧ -b^{4, 193}_0 ∧ true) 
c  in CNF:
c    -b^{4, 193}_2 ∨  b^{4, 193}_1 ∨  b^{4, 193}_0 ∨ false 
c  in DIMACS:
-8132  8133  8134  0

c  3 does not represent an automaton state.
c    -(-b^{4, 193}_2 ∧  b^{4, 193}_1 ∧  b^{4, 193}_0 ∧ true) 
c  in CNF:
c     b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ false 
c  in DIMACS:
 8132 -8133 -8134  0
c  -3 does not represent an automaton state.
c    -( b^{4, 193}_2 ∧  b^{4, 193}_1 ∧  b^{4, 193}_0 ∧ true) 
c  in CNF:
c    -b^{4, 193}_2 ∨ -b^{4, 193}_1 ∨ -b^{4, 193}_0 ∨ false 
c  in DIMACS:
-8132 -8133 -8134  0

c i = 194
c  -2+1 --> -1
c    ( b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧  p_776) -> ( b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0)
c  in CNF:
c    -b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨  b^{4, 195}_2
c    -b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_1
c    -b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨  b^{4, 195}_0
c  in DIMACS:
-8135 -8136  8137 -776  8138 0
-8135 -8136  8137 -776 -8139 0
-8135 -8136  8137 -776  8140 0

c  -1+1 --> 0
c    ( b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0 ∧  p_776) -> (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧ -b^{4, 195}_0)
c  in CNF:
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_2
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_1
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_0
c  in DIMACS:
-8135  8136 -8137 -776 -8138 0
-8135  8136 -8137 -776 -8139 0
-8135  8136 -8137 -776 -8140 0

c  0+1 --> 1
c    (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧  p_776) -> (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0)
c  in CNF:
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_2
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_1
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨  b^{4, 195}_0
c  in DIMACS:
 8135  8136  8137 -776 -8138 0
 8135  8136  8137 -776 -8139 0
 8135  8136  8137 -776  8140 0

c  1+1 --> 2
c    (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0 ∧  p_776) -> (-b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0)
c  in CNF:
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_2
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨  b^{4, 195}_1
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ -p_776 ∨ -b^{4, 195}_0
c  in DIMACS:
 8135  8136 -8137 -776 -8138 0
 8135  8136 -8137 -776  8139 0
 8135  8136 -8137 -776 -8140 0

c  2+1 --> break 
c    (-b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧  p_776) -> break
c  in CNF:
c     b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 8135 -8136  8137 -776 1162 0


c  2-1 --> 1
c    (-b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧ -p_776) -> (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0)
c  in CNF:
c     b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_2
c     b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_1
c     b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨  b^{4, 195}_0
c  in DIMACS:
 8135 -8136  8137  776 -8138 0
 8135 -8136  8137  776 -8139 0
 8135 -8136  8137  776  8140 0

c  1-1 --> 0
c    (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0 ∧ -p_776) -> (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧ -b^{4, 195}_0)
c  in CNF:
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_2
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_1
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_0
c  in DIMACS:
 8135  8136 -8137  776 -8138 0
 8135  8136 -8137  776 -8139 0
 8135  8136 -8137  776 -8140 0

c  0-1 --> -1
c    (-b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧ -p_776) -> ( b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0)
c  in CNF:
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨  b^{4, 195}_2
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_1
c     b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨  b^{4, 195}_0
c  in DIMACS:
 8135  8136  8137  776  8138 0
 8135  8136  8137  776 -8139 0
 8135  8136  8137  776  8140 0

c  -1-1 --> -2
c    ( b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧  b^{4, 194}_0 ∧ -p_776) -> ( b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0)
c  in CNF:
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨  b^{4, 195}_2
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨  b^{4, 195}_1
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨  p_776 ∨ -b^{4, 195}_0
c  in DIMACS:
-8135  8136 -8137  776  8138 0
-8135  8136 -8137  776  8139 0
-8135  8136 -8137  776 -8140 0

c  -2-1 --> break 
c    ( b^{4, 194}_2 ∧  b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨  b^{4, 194}_0 ∨  p_776 ∨ break
c  in DIMACS:
-8135 -8136  8137  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 194}_2 ∧ -b^{4, 194}_1 ∧ -b^{4, 194}_0 ∧ true) 
c  in CNF:
c    -b^{4, 194}_2 ∨  b^{4, 194}_1 ∨  b^{4, 194}_0 ∨ false 
c  in DIMACS:
-8135  8136  8137  0

c  3 does not represent an automaton state.
c    -(-b^{4, 194}_2 ∧  b^{4, 194}_1 ∧  b^{4, 194}_0 ∧ true) 
c  in CNF:
c     b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ false 
c  in DIMACS:
 8135 -8136 -8137  0
c  -3 does not represent an automaton state.
c    -( b^{4, 194}_2 ∧  b^{4, 194}_1 ∧  b^{4, 194}_0 ∧ true) 
c  in CNF:
c    -b^{4, 194}_2 ∨ -b^{4, 194}_1 ∨ -b^{4, 194}_0 ∨ false 
c  in DIMACS:
-8135 -8136 -8137  0

c i = 195
c  -2+1 --> -1
c    ( b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧  p_780) -> ( b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0)
c  in CNF:
c    -b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨  b^{4, 196}_2
c    -b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_1
c    -b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨  b^{4, 196}_0
c  in DIMACS:
-8138 -8139  8140 -780  8141 0
-8138 -8139  8140 -780 -8142 0
-8138 -8139  8140 -780  8143 0

c  -1+1 --> 0
c    ( b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0 ∧  p_780) -> (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧ -b^{4, 196}_0)
c  in CNF:
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_2
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_1
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_0
c  in DIMACS:
-8138  8139 -8140 -780 -8141 0
-8138  8139 -8140 -780 -8142 0
-8138  8139 -8140 -780 -8143 0

c  0+1 --> 1
c    (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧  p_780) -> (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0)
c  in CNF:
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_2
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_1
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨  b^{4, 196}_0
c  in DIMACS:
 8138  8139  8140 -780 -8141 0
 8138  8139  8140 -780 -8142 0
 8138  8139  8140 -780  8143 0

c  1+1 --> 2
c    (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0 ∧  p_780) -> (-b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0)
c  in CNF:
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_2
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨  b^{4, 196}_1
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ -p_780 ∨ -b^{4, 196}_0
c  in DIMACS:
 8138  8139 -8140 -780 -8141 0
 8138  8139 -8140 -780  8142 0
 8138  8139 -8140 -780 -8143 0

c  2+1 --> break 
c    (-b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧  p_780) -> break
c  in CNF:
c     b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 8138 -8139  8140 -780 1162 0


c  2-1 --> 1
c    (-b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧ -p_780) -> (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0)
c  in CNF:
c     b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_2
c     b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_1
c     b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨  b^{4, 196}_0
c  in DIMACS:
 8138 -8139  8140  780 -8141 0
 8138 -8139  8140  780 -8142 0
 8138 -8139  8140  780  8143 0

c  1-1 --> 0
c    (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0 ∧ -p_780) -> (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧ -b^{4, 196}_0)
c  in CNF:
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_2
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_1
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_0
c  in DIMACS:
 8138  8139 -8140  780 -8141 0
 8138  8139 -8140  780 -8142 0
 8138  8139 -8140  780 -8143 0

c  0-1 --> -1
c    (-b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧ -p_780) -> ( b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0)
c  in CNF:
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨  b^{4, 196}_2
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_1
c     b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨  b^{4, 196}_0
c  in DIMACS:
 8138  8139  8140  780  8141 0
 8138  8139  8140  780 -8142 0
 8138  8139  8140  780  8143 0

c  -1-1 --> -2
c    ( b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧  b^{4, 195}_0 ∧ -p_780) -> ( b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0)
c  in CNF:
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨  b^{4, 196}_2
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨  b^{4, 196}_1
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨  p_780 ∨ -b^{4, 196}_0
c  in DIMACS:
-8138  8139 -8140  780  8141 0
-8138  8139 -8140  780  8142 0
-8138  8139 -8140  780 -8143 0

c  -2-1 --> break 
c    ( b^{4, 195}_2 ∧  b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨  b^{4, 195}_0 ∨  p_780 ∨ break
c  in DIMACS:
-8138 -8139  8140  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 195}_2 ∧ -b^{4, 195}_1 ∧ -b^{4, 195}_0 ∧ true) 
c  in CNF:
c    -b^{4, 195}_2 ∨  b^{4, 195}_1 ∨  b^{4, 195}_0 ∨ false 
c  in DIMACS:
-8138  8139  8140  0

c  3 does not represent an automaton state.
c    -(-b^{4, 195}_2 ∧  b^{4, 195}_1 ∧  b^{4, 195}_0 ∧ true) 
c  in CNF:
c     b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ false 
c  in DIMACS:
 8138 -8139 -8140  0
c  -3 does not represent an automaton state.
c    -( b^{4, 195}_2 ∧  b^{4, 195}_1 ∧  b^{4, 195}_0 ∧ true) 
c  in CNF:
c    -b^{4, 195}_2 ∨ -b^{4, 195}_1 ∨ -b^{4, 195}_0 ∨ false 
c  in DIMACS:
-8138 -8139 -8140  0

c i = 196
c  -2+1 --> -1
c    ( b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧  p_784) -> ( b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0)
c  in CNF:
c    -b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨  b^{4, 197}_2
c    -b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_1
c    -b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨  b^{4, 197}_0
c  in DIMACS:
-8141 -8142  8143 -784  8144 0
-8141 -8142  8143 -784 -8145 0
-8141 -8142  8143 -784  8146 0

c  -1+1 --> 0
c    ( b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0 ∧  p_784) -> (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧ -b^{4, 197}_0)
c  in CNF:
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_2
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_1
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_0
c  in DIMACS:
-8141  8142 -8143 -784 -8144 0
-8141  8142 -8143 -784 -8145 0
-8141  8142 -8143 -784 -8146 0

c  0+1 --> 1
c    (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧  p_784) -> (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0)
c  in CNF:
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_2
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_1
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨  b^{4, 197}_0
c  in DIMACS:
 8141  8142  8143 -784 -8144 0
 8141  8142  8143 -784 -8145 0
 8141  8142  8143 -784  8146 0

c  1+1 --> 2
c    (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0 ∧  p_784) -> (-b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0)
c  in CNF:
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_2
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨  b^{4, 197}_1
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ -p_784 ∨ -b^{4, 197}_0
c  in DIMACS:
 8141  8142 -8143 -784 -8144 0
 8141  8142 -8143 -784  8145 0
 8141  8142 -8143 -784 -8146 0

c  2+1 --> break 
c    (-b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧  p_784) -> break
c  in CNF:
c     b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 8141 -8142  8143 -784 1162 0


c  2-1 --> 1
c    (-b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧ -p_784) -> (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0)
c  in CNF:
c     b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_2
c     b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_1
c     b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨  b^{4, 197}_0
c  in DIMACS:
 8141 -8142  8143  784 -8144 0
 8141 -8142  8143  784 -8145 0
 8141 -8142  8143  784  8146 0

c  1-1 --> 0
c    (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0 ∧ -p_784) -> (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧ -b^{4, 197}_0)
c  in CNF:
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_2
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_1
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_0
c  in DIMACS:
 8141  8142 -8143  784 -8144 0
 8141  8142 -8143  784 -8145 0
 8141  8142 -8143  784 -8146 0

c  0-1 --> -1
c    (-b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧ -p_784) -> ( b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0)
c  in CNF:
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨  b^{4, 197}_2
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_1
c     b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨  b^{4, 197}_0
c  in DIMACS:
 8141  8142  8143  784  8144 0
 8141  8142  8143  784 -8145 0
 8141  8142  8143  784  8146 0

c  -1-1 --> -2
c    ( b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧  b^{4, 196}_0 ∧ -p_784) -> ( b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0)
c  in CNF:
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨  b^{4, 197}_2
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨  b^{4, 197}_1
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨  p_784 ∨ -b^{4, 197}_0
c  in DIMACS:
-8141  8142 -8143  784  8144 0
-8141  8142 -8143  784  8145 0
-8141  8142 -8143  784 -8146 0

c  -2-1 --> break 
c    ( b^{4, 196}_2 ∧  b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨  b^{4, 196}_0 ∨  p_784 ∨ break
c  in DIMACS:
-8141 -8142  8143  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 196}_2 ∧ -b^{4, 196}_1 ∧ -b^{4, 196}_0 ∧ true) 
c  in CNF:
c    -b^{4, 196}_2 ∨  b^{4, 196}_1 ∨  b^{4, 196}_0 ∨ false 
c  in DIMACS:
-8141  8142  8143  0

c  3 does not represent an automaton state.
c    -(-b^{4, 196}_2 ∧  b^{4, 196}_1 ∧  b^{4, 196}_0 ∧ true) 
c  in CNF:
c     b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ false 
c  in DIMACS:
 8141 -8142 -8143  0
c  -3 does not represent an automaton state.
c    -( b^{4, 196}_2 ∧  b^{4, 196}_1 ∧  b^{4, 196}_0 ∧ true) 
c  in CNF:
c    -b^{4, 196}_2 ∨ -b^{4, 196}_1 ∨ -b^{4, 196}_0 ∨ false 
c  in DIMACS:
-8141 -8142 -8143  0

c i = 197
c  -2+1 --> -1
c    ( b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧  p_788) -> ( b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0)
c  in CNF:
c    -b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨  b^{4, 198}_2
c    -b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_1
c    -b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨  b^{4, 198}_0
c  in DIMACS:
-8144 -8145  8146 -788  8147 0
-8144 -8145  8146 -788 -8148 0
-8144 -8145  8146 -788  8149 0

c  -1+1 --> 0
c    ( b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0 ∧  p_788) -> (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧ -b^{4, 198}_0)
c  in CNF:
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_2
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_1
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_0
c  in DIMACS:
-8144  8145 -8146 -788 -8147 0
-8144  8145 -8146 -788 -8148 0
-8144  8145 -8146 -788 -8149 0

c  0+1 --> 1
c    (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧  p_788) -> (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0)
c  in CNF:
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_2
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_1
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨  b^{4, 198}_0
c  in DIMACS:
 8144  8145  8146 -788 -8147 0
 8144  8145  8146 -788 -8148 0
 8144  8145  8146 -788  8149 0

c  1+1 --> 2
c    (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0 ∧  p_788) -> (-b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0)
c  in CNF:
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_2
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨  b^{4, 198}_1
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ -p_788 ∨ -b^{4, 198}_0
c  in DIMACS:
 8144  8145 -8146 -788 -8147 0
 8144  8145 -8146 -788  8148 0
 8144  8145 -8146 -788 -8149 0

c  2+1 --> break 
c    (-b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧  p_788) -> break
c  in CNF:
c     b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ -p_788 ∨ break
c  in DIMACS:
 8144 -8145  8146 -788 1162 0


c  2-1 --> 1
c    (-b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧ -p_788) -> (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0)
c  in CNF:
c     b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_2
c     b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_1
c     b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨  b^{4, 198}_0
c  in DIMACS:
 8144 -8145  8146  788 -8147 0
 8144 -8145  8146  788 -8148 0
 8144 -8145  8146  788  8149 0

c  1-1 --> 0
c    (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0 ∧ -p_788) -> (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧ -b^{4, 198}_0)
c  in CNF:
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_2
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_1
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_0
c  in DIMACS:
 8144  8145 -8146  788 -8147 0
 8144  8145 -8146  788 -8148 0
 8144  8145 -8146  788 -8149 0

c  0-1 --> -1
c    (-b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧ -p_788) -> ( b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0)
c  in CNF:
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨  b^{4, 198}_2
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_1
c     b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨  b^{4, 198}_0
c  in DIMACS:
 8144  8145  8146  788  8147 0
 8144  8145  8146  788 -8148 0
 8144  8145  8146  788  8149 0

c  -1-1 --> -2
c    ( b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧  b^{4, 197}_0 ∧ -p_788) -> ( b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0)
c  in CNF:
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨  b^{4, 198}_2
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨  b^{4, 198}_1
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨  p_788 ∨ -b^{4, 198}_0
c  in DIMACS:
-8144  8145 -8146  788  8147 0
-8144  8145 -8146  788  8148 0
-8144  8145 -8146  788 -8149 0

c  -2-1 --> break 
c    ( b^{4, 197}_2 ∧  b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧ -p_788) -> break
c  in CNF:
c    -b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨  b^{4, 197}_0 ∨  p_788 ∨ break
c  in DIMACS:
-8144 -8145  8146  788 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 197}_2 ∧ -b^{4, 197}_1 ∧ -b^{4, 197}_0 ∧ true) 
c  in CNF:
c    -b^{4, 197}_2 ∨  b^{4, 197}_1 ∨  b^{4, 197}_0 ∨ false 
c  in DIMACS:
-8144  8145  8146  0

c  3 does not represent an automaton state.
c    -(-b^{4, 197}_2 ∧  b^{4, 197}_1 ∧  b^{4, 197}_0 ∧ true) 
c  in CNF:
c     b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ false 
c  in DIMACS:
 8144 -8145 -8146  0
c  -3 does not represent an automaton state.
c    -( b^{4, 197}_2 ∧  b^{4, 197}_1 ∧  b^{4, 197}_0 ∧ true) 
c  in CNF:
c    -b^{4, 197}_2 ∨ -b^{4, 197}_1 ∨ -b^{4, 197}_0 ∨ false 
c  in DIMACS:
-8144 -8145 -8146  0

c i = 198
c  -2+1 --> -1
c    ( b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧  p_792) -> ( b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0)
c  in CNF:
c    -b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨  b^{4, 199}_2
c    -b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_1
c    -b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨  b^{4, 199}_0
c  in DIMACS:
-8147 -8148  8149 -792  8150 0
-8147 -8148  8149 -792 -8151 0
-8147 -8148  8149 -792  8152 0

c  -1+1 --> 0
c    ( b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0 ∧  p_792) -> (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧ -b^{4, 199}_0)
c  in CNF:
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_2
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_1
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_0
c  in DIMACS:
-8147  8148 -8149 -792 -8150 0
-8147  8148 -8149 -792 -8151 0
-8147  8148 -8149 -792 -8152 0

c  0+1 --> 1
c    (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧  p_792) -> (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0)
c  in CNF:
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_2
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_1
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨  b^{4, 199}_0
c  in DIMACS:
 8147  8148  8149 -792 -8150 0
 8147  8148  8149 -792 -8151 0
 8147  8148  8149 -792  8152 0

c  1+1 --> 2
c    (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0 ∧  p_792) -> (-b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0)
c  in CNF:
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_2
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨  b^{4, 199}_1
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ -p_792 ∨ -b^{4, 199}_0
c  in DIMACS:
 8147  8148 -8149 -792 -8150 0
 8147  8148 -8149 -792  8151 0
 8147  8148 -8149 -792 -8152 0

c  2+1 --> break 
c    (-b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧  p_792) -> break
c  in CNF:
c     b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 8147 -8148  8149 -792 1162 0


c  2-1 --> 1
c    (-b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧ -p_792) -> (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0)
c  in CNF:
c     b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_2
c     b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_1
c     b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨  b^{4, 199}_0
c  in DIMACS:
 8147 -8148  8149  792 -8150 0
 8147 -8148  8149  792 -8151 0
 8147 -8148  8149  792  8152 0

c  1-1 --> 0
c    (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0 ∧ -p_792) -> (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧ -b^{4, 199}_0)
c  in CNF:
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_2
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_1
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_0
c  in DIMACS:
 8147  8148 -8149  792 -8150 0
 8147  8148 -8149  792 -8151 0
 8147  8148 -8149  792 -8152 0

c  0-1 --> -1
c    (-b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧ -p_792) -> ( b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0)
c  in CNF:
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨  b^{4, 199}_2
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_1
c     b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨  b^{4, 199}_0
c  in DIMACS:
 8147  8148  8149  792  8150 0
 8147  8148  8149  792 -8151 0
 8147  8148  8149  792  8152 0

c  -1-1 --> -2
c    ( b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧  b^{4, 198}_0 ∧ -p_792) -> ( b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0)
c  in CNF:
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨  b^{4, 199}_2
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨  b^{4, 199}_1
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨  p_792 ∨ -b^{4, 199}_0
c  in DIMACS:
-8147  8148 -8149  792  8150 0
-8147  8148 -8149  792  8151 0
-8147  8148 -8149  792 -8152 0

c  -2-1 --> break 
c    ( b^{4, 198}_2 ∧  b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨  b^{4, 198}_0 ∨  p_792 ∨ break
c  in DIMACS:
-8147 -8148  8149  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 198}_2 ∧ -b^{4, 198}_1 ∧ -b^{4, 198}_0 ∧ true) 
c  in CNF:
c    -b^{4, 198}_2 ∨  b^{4, 198}_1 ∨  b^{4, 198}_0 ∨ false 
c  in DIMACS:
-8147  8148  8149  0

c  3 does not represent an automaton state.
c    -(-b^{4, 198}_2 ∧  b^{4, 198}_1 ∧  b^{4, 198}_0 ∧ true) 
c  in CNF:
c     b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ false 
c  in DIMACS:
 8147 -8148 -8149  0
c  -3 does not represent an automaton state.
c    -( b^{4, 198}_2 ∧  b^{4, 198}_1 ∧  b^{4, 198}_0 ∧ true) 
c  in CNF:
c    -b^{4, 198}_2 ∨ -b^{4, 198}_1 ∨ -b^{4, 198}_0 ∨ false 
c  in DIMACS:
-8147 -8148 -8149  0

c i = 199
c  -2+1 --> -1
c    ( b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧  p_796) -> ( b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0)
c  in CNF:
c    -b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨  b^{4, 200}_2
c    -b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_1
c    -b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨  b^{4, 200}_0
c  in DIMACS:
-8150 -8151  8152 -796  8153 0
-8150 -8151  8152 -796 -8154 0
-8150 -8151  8152 -796  8155 0

c  -1+1 --> 0
c    ( b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0 ∧  p_796) -> (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧ -b^{4, 200}_0)
c  in CNF:
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_2
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_1
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_0
c  in DIMACS:
-8150  8151 -8152 -796 -8153 0
-8150  8151 -8152 -796 -8154 0
-8150  8151 -8152 -796 -8155 0

c  0+1 --> 1
c    (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧  p_796) -> (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0)
c  in CNF:
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_2
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_1
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨  b^{4, 200}_0
c  in DIMACS:
 8150  8151  8152 -796 -8153 0
 8150  8151  8152 -796 -8154 0
 8150  8151  8152 -796  8155 0

c  1+1 --> 2
c    (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0 ∧  p_796) -> (-b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0)
c  in CNF:
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_2
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨  b^{4, 200}_1
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ -p_796 ∨ -b^{4, 200}_0
c  in DIMACS:
 8150  8151 -8152 -796 -8153 0
 8150  8151 -8152 -796  8154 0
 8150  8151 -8152 -796 -8155 0

c  2+1 --> break 
c    (-b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧  p_796) -> break
c  in CNF:
c     b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ -p_796 ∨ break
c  in DIMACS:
 8150 -8151  8152 -796 1162 0


c  2-1 --> 1
c    (-b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧ -p_796) -> (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0)
c  in CNF:
c     b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_2
c     b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_1
c     b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨  b^{4, 200}_0
c  in DIMACS:
 8150 -8151  8152  796 -8153 0
 8150 -8151  8152  796 -8154 0
 8150 -8151  8152  796  8155 0

c  1-1 --> 0
c    (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0 ∧ -p_796) -> (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧ -b^{4, 200}_0)
c  in CNF:
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_2
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_1
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_0
c  in DIMACS:
 8150  8151 -8152  796 -8153 0
 8150  8151 -8152  796 -8154 0
 8150  8151 -8152  796 -8155 0

c  0-1 --> -1
c    (-b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧ -p_796) -> ( b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0)
c  in CNF:
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨  b^{4, 200}_2
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_1
c     b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨  b^{4, 200}_0
c  in DIMACS:
 8150  8151  8152  796  8153 0
 8150  8151  8152  796 -8154 0
 8150  8151  8152  796  8155 0

c  -1-1 --> -2
c    ( b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧  b^{4, 199}_0 ∧ -p_796) -> ( b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0)
c  in CNF:
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨  b^{4, 200}_2
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨  b^{4, 200}_1
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨  p_796 ∨ -b^{4, 200}_0
c  in DIMACS:
-8150  8151 -8152  796  8153 0
-8150  8151 -8152  796  8154 0
-8150  8151 -8152  796 -8155 0

c  -2-1 --> break 
c    ( b^{4, 199}_2 ∧  b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧ -p_796) -> break
c  in CNF:
c    -b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨  b^{4, 199}_0 ∨  p_796 ∨ break
c  in DIMACS:
-8150 -8151  8152  796 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 199}_2 ∧ -b^{4, 199}_1 ∧ -b^{4, 199}_0 ∧ true) 
c  in CNF:
c    -b^{4, 199}_2 ∨  b^{4, 199}_1 ∨  b^{4, 199}_0 ∨ false 
c  in DIMACS:
-8150  8151  8152  0

c  3 does not represent an automaton state.
c    -(-b^{4, 199}_2 ∧  b^{4, 199}_1 ∧  b^{4, 199}_0 ∧ true) 
c  in CNF:
c     b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ false 
c  in DIMACS:
 8150 -8151 -8152  0
c  -3 does not represent an automaton state.
c    -( b^{4, 199}_2 ∧  b^{4, 199}_1 ∧  b^{4, 199}_0 ∧ true) 
c  in CNF:
c    -b^{4, 199}_2 ∨ -b^{4, 199}_1 ∨ -b^{4, 199}_0 ∨ false 
c  in DIMACS:
-8150 -8151 -8152  0

c i = 200
c  -2+1 --> -1
c    ( b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧  p_800) -> ( b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0)
c  in CNF:
c    -b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨  b^{4, 201}_2
c    -b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_1
c    -b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨  b^{4, 201}_0
c  in DIMACS:
-8153 -8154  8155 -800  8156 0
-8153 -8154  8155 -800 -8157 0
-8153 -8154  8155 -800  8158 0

c  -1+1 --> 0
c    ( b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0 ∧  p_800) -> (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧ -b^{4, 201}_0)
c  in CNF:
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_2
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_1
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_0
c  in DIMACS:
-8153  8154 -8155 -800 -8156 0
-8153  8154 -8155 -800 -8157 0
-8153  8154 -8155 -800 -8158 0

c  0+1 --> 1
c    (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧  p_800) -> (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0)
c  in CNF:
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_2
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_1
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨  b^{4, 201}_0
c  in DIMACS:
 8153  8154  8155 -800 -8156 0
 8153  8154  8155 -800 -8157 0
 8153  8154  8155 -800  8158 0

c  1+1 --> 2
c    (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0 ∧  p_800) -> (-b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0)
c  in CNF:
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_2
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨  b^{4, 201}_1
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ -p_800 ∨ -b^{4, 201}_0
c  in DIMACS:
 8153  8154 -8155 -800 -8156 0
 8153  8154 -8155 -800  8157 0
 8153  8154 -8155 -800 -8158 0

c  2+1 --> break 
c    (-b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧  p_800) -> break
c  in CNF:
c     b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 8153 -8154  8155 -800 1162 0


c  2-1 --> 1
c    (-b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧ -p_800) -> (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0)
c  in CNF:
c     b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_2
c     b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_1
c     b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨  b^{4, 201}_0
c  in DIMACS:
 8153 -8154  8155  800 -8156 0
 8153 -8154  8155  800 -8157 0
 8153 -8154  8155  800  8158 0

c  1-1 --> 0
c    (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0 ∧ -p_800) -> (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧ -b^{4, 201}_0)
c  in CNF:
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_2
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_1
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_0
c  in DIMACS:
 8153  8154 -8155  800 -8156 0
 8153  8154 -8155  800 -8157 0
 8153  8154 -8155  800 -8158 0

c  0-1 --> -1
c    (-b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧ -p_800) -> ( b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0)
c  in CNF:
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨  b^{4, 201}_2
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_1
c     b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨  b^{4, 201}_0
c  in DIMACS:
 8153  8154  8155  800  8156 0
 8153  8154  8155  800 -8157 0
 8153  8154  8155  800  8158 0

c  -1-1 --> -2
c    ( b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧  b^{4, 200}_0 ∧ -p_800) -> ( b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0)
c  in CNF:
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨  b^{4, 201}_2
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨  b^{4, 201}_1
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨  p_800 ∨ -b^{4, 201}_0
c  in DIMACS:
-8153  8154 -8155  800  8156 0
-8153  8154 -8155  800  8157 0
-8153  8154 -8155  800 -8158 0

c  -2-1 --> break 
c    ( b^{4, 200}_2 ∧  b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨  b^{4, 200}_0 ∨  p_800 ∨ break
c  in DIMACS:
-8153 -8154  8155  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 200}_2 ∧ -b^{4, 200}_1 ∧ -b^{4, 200}_0 ∧ true) 
c  in CNF:
c    -b^{4, 200}_2 ∨  b^{4, 200}_1 ∨  b^{4, 200}_0 ∨ false 
c  in DIMACS:
-8153  8154  8155  0

c  3 does not represent an automaton state.
c    -(-b^{4, 200}_2 ∧  b^{4, 200}_1 ∧  b^{4, 200}_0 ∧ true) 
c  in CNF:
c     b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ false 
c  in DIMACS:
 8153 -8154 -8155  0
c  -3 does not represent an automaton state.
c    -( b^{4, 200}_2 ∧  b^{4, 200}_1 ∧  b^{4, 200}_0 ∧ true) 
c  in CNF:
c    -b^{4, 200}_2 ∨ -b^{4, 200}_1 ∨ -b^{4, 200}_0 ∨ false 
c  in DIMACS:
-8153 -8154 -8155  0

c i = 201
c  -2+1 --> -1
c    ( b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧  p_804) -> ( b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0)
c  in CNF:
c    -b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨  b^{4, 202}_2
c    -b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_1
c    -b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨  b^{4, 202}_0
c  in DIMACS:
-8156 -8157  8158 -804  8159 0
-8156 -8157  8158 -804 -8160 0
-8156 -8157  8158 -804  8161 0

c  -1+1 --> 0
c    ( b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0 ∧  p_804) -> (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧ -b^{4, 202}_0)
c  in CNF:
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_2
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_1
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_0
c  in DIMACS:
-8156  8157 -8158 -804 -8159 0
-8156  8157 -8158 -804 -8160 0
-8156  8157 -8158 -804 -8161 0

c  0+1 --> 1
c    (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧  p_804) -> (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0)
c  in CNF:
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_2
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_1
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨  b^{4, 202}_0
c  in DIMACS:
 8156  8157  8158 -804 -8159 0
 8156  8157  8158 -804 -8160 0
 8156  8157  8158 -804  8161 0

c  1+1 --> 2
c    (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0 ∧  p_804) -> (-b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0)
c  in CNF:
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_2
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨  b^{4, 202}_1
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ -p_804 ∨ -b^{4, 202}_0
c  in DIMACS:
 8156  8157 -8158 -804 -8159 0
 8156  8157 -8158 -804  8160 0
 8156  8157 -8158 -804 -8161 0

c  2+1 --> break 
c    (-b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧  p_804) -> break
c  in CNF:
c     b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 8156 -8157  8158 -804 1162 0


c  2-1 --> 1
c    (-b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧ -p_804) -> (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0)
c  in CNF:
c     b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_2
c     b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_1
c     b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨  b^{4, 202}_0
c  in DIMACS:
 8156 -8157  8158  804 -8159 0
 8156 -8157  8158  804 -8160 0
 8156 -8157  8158  804  8161 0

c  1-1 --> 0
c    (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0 ∧ -p_804) -> (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧ -b^{4, 202}_0)
c  in CNF:
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_2
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_1
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_0
c  in DIMACS:
 8156  8157 -8158  804 -8159 0
 8156  8157 -8158  804 -8160 0
 8156  8157 -8158  804 -8161 0

c  0-1 --> -1
c    (-b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧ -p_804) -> ( b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0)
c  in CNF:
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨  b^{4, 202}_2
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_1
c     b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨  b^{4, 202}_0
c  in DIMACS:
 8156  8157  8158  804  8159 0
 8156  8157  8158  804 -8160 0
 8156  8157  8158  804  8161 0

c  -1-1 --> -2
c    ( b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧  b^{4, 201}_0 ∧ -p_804) -> ( b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0)
c  in CNF:
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨  b^{4, 202}_2
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨  b^{4, 202}_1
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨  p_804 ∨ -b^{4, 202}_0
c  in DIMACS:
-8156  8157 -8158  804  8159 0
-8156  8157 -8158  804  8160 0
-8156  8157 -8158  804 -8161 0

c  -2-1 --> break 
c    ( b^{4, 201}_2 ∧  b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨  b^{4, 201}_0 ∨  p_804 ∨ break
c  in DIMACS:
-8156 -8157  8158  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 201}_2 ∧ -b^{4, 201}_1 ∧ -b^{4, 201}_0 ∧ true) 
c  in CNF:
c    -b^{4, 201}_2 ∨  b^{4, 201}_1 ∨  b^{4, 201}_0 ∨ false 
c  in DIMACS:
-8156  8157  8158  0

c  3 does not represent an automaton state.
c    -(-b^{4, 201}_2 ∧  b^{4, 201}_1 ∧  b^{4, 201}_0 ∧ true) 
c  in CNF:
c     b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ false 
c  in DIMACS:
 8156 -8157 -8158  0
c  -3 does not represent an automaton state.
c    -( b^{4, 201}_2 ∧  b^{4, 201}_1 ∧  b^{4, 201}_0 ∧ true) 
c  in CNF:
c    -b^{4, 201}_2 ∨ -b^{4, 201}_1 ∨ -b^{4, 201}_0 ∨ false 
c  in DIMACS:
-8156 -8157 -8158  0

c i = 202
c  -2+1 --> -1
c    ( b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧  p_808) -> ( b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0)
c  in CNF:
c    -b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨  b^{4, 203}_2
c    -b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_1
c    -b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨  b^{4, 203}_0
c  in DIMACS:
-8159 -8160  8161 -808  8162 0
-8159 -8160  8161 -808 -8163 0
-8159 -8160  8161 -808  8164 0

c  -1+1 --> 0
c    ( b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0 ∧  p_808) -> (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧ -b^{4, 203}_0)
c  in CNF:
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_2
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_1
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_0
c  in DIMACS:
-8159  8160 -8161 -808 -8162 0
-8159  8160 -8161 -808 -8163 0
-8159  8160 -8161 -808 -8164 0

c  0+1 --> 1
c    (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧  p_808) -> (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0)
c  in CNF:
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_2
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_1
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨  b^{4, 203}_0
c  in DIMACS:
 8159  8160  8161 -808 -8162 0
 8159  8160  8161 -808 -8163 0
 8159  8160  8161 -808  8164 0

c  1+1 --> 2
c    (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0 ∧  p_808) -> (-b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0)
c  in CNF:
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_2
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨  b^{4, 203}_1
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ -p_808 ∨ -b^{4, 203}_0
c  in DIMACS:
 8159  8160 -8161 -808 -8162 0
 8159  8160 -8161 -808  8163 0
 8159  8160 -8161 -808 -8164 0

c  2+1 --> break 
c    (-b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧  p_808) -> break
c  in CNF:
c     b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 8159 -8160  8161 -808 1162 0


c  2-1 --> 1
c    (-b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧ -p_808) -> (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0)
c  in CNF:
c     b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_2
c     b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_1
c     b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨  b^{4, 203}_0
c  in DIMACS:
 8159 -8160  8161  808 -8162 0
 8159 -8160  8161  808 -8163 0
 8159 -8160  8161  808  8164 0

c  1-1 --> 0
c    (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0 ∧ -p_808) -> (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧ -b^{4, 203}_0)
c  in CNF:
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_2
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_1
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_0
c  in DIMACS:
 8159  8160 -8161  808 -8162 0
 8159  8160 -8161  808 -8163 0
 8159  8160 -8161  808 -8164 0

c  0-1 --> -1
c    (-b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧ -p_808) -> ( b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0)
c  in CNF:
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨  b^{4, 203}_2
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_1
c     b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨  b^{4, 203}_0
c  in DIMACS:
 8159  8160  8161  808  8162 0
 8159  8160  8161  808 -8163 0
 8159  8160  8161  808  8164 0

c  -1-1 --> -2
c    ( b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧  b^{4, 202}_0 ∧ -p_808) -> ( b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0)
c  in CNF:
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨  b^{4, 203}_2
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨  b^{4, 203}_1
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨  p_808 ∨ -b^{4, 203}_0
c  in DIMACS:
-8159  8160 -8161  808  8162 0
-8159  8160 -8161  808  8163 0
-8159  8160 -8161  808 -8164 0

c  -2-1 --> break 
c    ( b^{4, 202}_2 ∧  b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨  b^{4, 202}_0 ∨  p_808 ∨ break
c  in DIMACS:
-8159 -8160  8161  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 202}_2 ∧ -b^{4, 202}_1 ∧ -b^{4, 202}_0 ∧ true) 
c  in CNF:
c    -b^{4, 202}_2 ∨  b^{4, 202}_1 ∨  b^{4, 202}_0 ∨ false 
c  in DIMACS:
-8159  8160  8161  0

c  3 does not represent an automaton state.
c    -(-b^{4, 202}_2 ∧  b^{4, 202}_1 ∧  b^{4, 202}_0 ∧ true) 
c  in CNF:
c     b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ false 
c  in DIMACS:
 8159 -8160 -8161  0
c  -3 does not represent an automaton state.
c    -( b^{4, 202}_2 ∧  b^{4, 202}_1 ∧  b^{4, 202}_0 ∧ true) 
c  in CNF:
c    -b^{4, 202}_2 ∨ -b^{4, 202}_1 ∨ -b^{4, 202}_0 ∨ false 
c  in DIMACS:
-8159 -8160 -8161  0

c i = 203
c  -2+1 --> -1
c    ( b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧  p_812) -> ( b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0)
c  in CNF:
c    -b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨  b^{4, 204}_2
c    -b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_1
c    -b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨  b^{4, 204}_0
c  in DIMACS:
-8162 -8163  8164 -812  8165 0
-8162 -8163  8164 -812 -8166 0
-8162 -8163  8164 -812  8167 0

c  -1+1 --> 0
c    ( b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0 ∧  p_812) -> (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧ -b^{4, 204}_0)
c  in CNF:
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_2
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_1
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_0
c  in DIMACS:
-8162  8163 -8164 -812 -8165 0
-8162  8163 -8164 -812 -8166 0
-8162  8163 -8164 -812 -8167 0

c  0+1 --> 1
c    (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧  p_812) -> (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0)
c  in CNF:
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_2
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_1
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨  b^{4, 204}_0
c  in DIMACS:
 8162  8163  8164 -812 -8165 0
 8162  8163  8164 -812 -8166 0
 8162  8163  8164 -812  8167 0

c  1+1 --> 2
c    (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0 ∧  p_812) -> (-b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0)
c  in CNF:
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_2
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨  b^{4, 204}_1
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ -p_812 ∨ -b^{4, 204}_0
c  in DIMACS:
 8162  8163 -8164 -812 -8165 0
 8162  8163 -8164 -812  8166 0
 8162  8163 -8164 -812 -8167 0

c  2+1 --> break 
c    (-b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧  p_812) -> break
c  in CNF:
c     b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 8162 -8163  8164 -812 1162 0


c  2-1 --> 1
c    (-b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧ -p_812) -> (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0)
c  in CNF:
c     b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_2
c     b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_1
c     b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨  b^{4, 204}_0
c  in DIMACS:
 8162 -8163  8164  812 -8165 0
 8162 -8163  8164  812 -8166 0
 8162 -8163  8164  812  8167 0

c  1-1 --> 0
c    (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0 ∧ -p_812) -> (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧ -b^{4, 204}_0)
c  in CNF:
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_2
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_1
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_0
c  in DIMACS:
 8162  8163 -8164  812 -8165 0
 8162  8163 -8164  812 -8166 0
 8162  8163 -8164  812 -8167 0

c  0-1 --> -1
c    (-b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧ -p_812) -> ( b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0)
c  in CNF:
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨  b^{4, 204}_2
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_1
c     b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨  b^{4, 204}_0
c  in DIMACS:
 8162  8163  8164  812  8165 0
 8162  8163  8164  812 -8166 0
 8162  8163  8164  812  8167 0

c  -1-1 --> -2
c    ( b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧  b^{4, 203}_0 ∧ -p_812) -> ( b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0)
c  in CNF:
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨  b^{4, 204}_2
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨  b^{4, 204}_1
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨  p_812 ∨ -b^{4, 204}_0
c  in DIMACS:
-8162  8163 -8164  812  8165 0
-8162  8163 -8164  812  8166 0
-8162  8163 -8164  812 -8167 0

c  -2-1 --> break 
c    ( b^{4, 203}_2 ∧  b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨  b^{4, 203}_0 ∨  p_812 ∨ break
c  in DIMACS:
-8162 -8163  8164  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 203}_2 ∧ -b^{4, 203}_1 ∧ -b^{4, 203}_0 ∧ true) 
c  in CNF:
c    -b^{4, 203}_2 ∨  b^{4, 203}_1 ∨  b^{4, 203}_0 ∨ false 
c  in DIMACS:
-8162  8163  8164  0

c  3 does not represent an automaton state.
c    -(-b^{4, 203}_2 ∧  b^{4, 203}_1 ∧  b^{4, 203}_0 ∧ true) 
c  in CNF:
c     b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ false 
c  in DIMACS:
 8162 -8163 -8164  0
c  -3 does not represent an automaton state.
c    -( b^{4, 203}_2 ∧  b^{4, 203}_1 ∧  b^{4, 203}_0 ∧ true) 
c  in CNF:
c    -b^{4, 203}_2 ∨ -b^{4, 203}_1 ∨ -b^{4, 203}_0 ∨ false 
c  in DIMACS:
-8162 -8163 -8164  0

c i = 204
c  -2+1 --> -1
c    ( b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧  p_816) -> ( b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0)
c  in CNF:
c    -b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨  b^{4, 205}_2
c    -b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_1
c    -b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨  b^{4, 205}_0
c  in DIMACS:
-8165 -8166  8167 -816  8168 0
-8165 -8166  8167 -816 -8169 0
-8165 -8166  8167 -816  8170 0

c  -1+1 --> 0
c    ( b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0 ∧  p_816) -> (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧ -b^{4, 205}_0)
c  in CNF:
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_2
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_1
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_0
c  in DIMACS:
-8165  8166 -8167 -816 -8168 0
-8165  8166 -8167 -816 -8169 0
-8165  8166 -8167 -816 -8170 0

c  0+1 --> 1
c    (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧  p_816) -> (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0)
c  in CNF:
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_2
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_1
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨  b^{4, 205}_0
c  in DIMACS:
 8165  8166  8167 -816 -8168 0
 8165  8166  8167 -816 -8169 0
 8165  8166  8167 -816  8170 0

c  1+1 --> 2
c    (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0 ∧  p_816) -> (-b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0)
c  in CNF:
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_2
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨  b^{4, 205}_1
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ -p_816 ∨ -b^{4, 205}_0
c  in DIMACS:
 8165  8166 -8167 -816 -8168 0
 8165  8166 -8167 -816  8169 0
 8165  8166 -8167 -816 -8170 0

c  2+1 --> break 
c    (-b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧  p_816) -> break
c  in CNF:
c     b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 8165 -8166  8167 -816 1162 0


c  2-1 --> 1
c    (-b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧ -p_816) -> (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0)
c  in CNF:
c     b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_2
c     b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_1
c     b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨  b^{4, 205}_0
c  in DIMACS:
 8165 -8166  8167  816 -8168 0
 8165 -8166  8167  816 -8169 0
 8165 -8166  8167  816  8170 0

c  1-1 --> 0
c    (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0 ∧ -p_816) -> (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧ -b^{4, 205}_0)
c  in CNF:
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_2
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_1
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_0
c  in DIMACS:
 8165  8166 -8167  816 -8168 0
 8165  8166 -8167  816 -8169 0
 8165  8166 -8167  816 -8170 0

c  0-1 --> -1
c    (-b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧ -p_816) -> ( b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0)
c  in CNF:
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨  b^{4, 205}_2
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_1
c     b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨  b^{4, 205}_0
c  in DIMACS:
 8165  8166  8167  816  8168 0
 8165  8166  8167  816 -8169 0
 8165  8166  8167  816  8170 0

c  -1-1 --> -2
c    ( b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧  b^{4, 204}_0 ∧ -p_816) -> ( b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0)
c  in CNF:
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨  b^{4, 205}_2
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨  b^{4, 205}_1
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨  p_816 ∨ -b^{4, 205}_0
c  in DIMACS:
-8165  8166 -8167  816  8168 0
-8165  8166 -8167  816  8169 0
-8165  8166 -8167  816 -8170 0

c  -2-1 --> break 
c    ( b^{4, 204}_2 ∧  b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨  b^{4, 204}_0 ∨  p_816 ∨ break
c  in DIMACS:
-8165 -8166  8167  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 204}_2 ∧ -b^{4, 204}_1 ∧ -b^{4, 204}_0 ∧ true) 
c  in CNF:
c    -b^{4, 204}_2 ∨  b^{4, 204}_1 ∨  b^{4, 204}_0 ∨ false 
c  in DIMACS:
-8165  8166  8167  0

c  3 does not represent an automaton state.
c    -(-b^{4, 204}_2 ∧  b^{4, 204}_1 ∧  b^{4, 204}_0 ∧ true) 
c  in CNF:
c     b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ false 
c  in DIMACS:
 8165 -8166 -8167  0
c  -3 does not represent an automaton state.
c    -( b^{4, 204}_2 ∧  b^{4, 204}_1 ∧  b^{4, 204}_0 ∧ true) 
c  in CNF:
c    -b^{4, 204}_2 ∨ -b^{4, 204}_1 ∨ -b^{4, 204}_0 ∨ false 
c  in DIMACS:
-8165 -8166 -8167  0

c i = 205
c  -2+1 --> -1
c    ( b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧  p_820) -> ( b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0)
c  in CNF:
c    -b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨  b^{4, 206}_2
c    -b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_1
c    -b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨  b^{4, 206}_0
c  in DIMACS:
-8168 -8169  8170 -820  8171 0
-8168 -8169  8170 -820 -8172 0
-8168 -8169  8170 -820  8173 0

c  -1+1 --> 0
c    ( b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0 ∧  p_820) -> (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧ -b^{4, 206}_0)
c  in CNF:
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_2
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_1
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_0
c  in DIMACS:
-8168  8169 -8170 -820 -8171 0
-8168  8169 -8170 -820 -8172 0
-8168  8169 -8170 -820 -8173 0

c  0+1 --> 1
c    (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧  p_820) -> (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0)
c  in CNF:
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_2
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_1
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨  b^{4, 206}_0
c  in DIMACS:
 8168  8169  8170 -820 -8171 0
 8168  8169  8170 -820 -8172 0
 8168  8169  8170 -820  8173 0

c  1+1 --> 2
c    (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0 ∧  p_820) -> (-b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0)
c  in CNF:
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_2
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨  b^{4, 206}_1
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ -p_820 ∨ -b^{4, 206}_0
c  in DIMACS:
 8168  8169 -8170 -820 -8171 0
 8168  8169 -8170 -820  8172 0
 8168  8169 -8170 -820 -8173 0

c  2+1 --> break 
c    (-b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧  p_820) -> break
c  in CNF:
c     b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 8168 -8169  8170 -820 1162 0


c  2-1 --> 1
c    (-b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧ -p_820) -> (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0)
c  in CNF:
c     b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_2
c     b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_1
c     b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨  b^{4, 206}_0
c  in DIMACS:
 8168 -8169  8170  820 -8171 0
 8168 -8169  8170  820 -8172 0
 8168 -8169  8170  820  8173 0

c  1-1 --> 0
c    (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0 ∧ -p_820) -> (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧ -b^{4, 206}_0)
c  in CNF:
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_2
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_1
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_0
c  in DIMACS:
 8168  8169 -8170  820 -8171 0
 8168  8169 -8170  820 -8172 0
 8168  8169 -8170  820 -8173 0

c  0-1 --> -1
c    (-b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧ -p_820) -> ( b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0)
c  in CNF:
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨  b^{4, 206}_2
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_1
c     b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨  b^{4, 206}_0
c  in DIMACS:
 8168  8169  8170  820  8171 0
 8168  8169  8170  820 -8172 0
 8168  8169  8170  820  8173 0

c  -1-1 --> -2
c    ( b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧  b^{4, 205}_0 ∧ -p_820) -> ( b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0)
c  in CNF:
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨  b^{4, 206}_2
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨  b^{4, 206}_1
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨  p_820 ∨ -b^{4, 206}_0
c  in DIMACS:
-8168  8169 -8170  820  8171 0
-8168  8169 -8170  820  8172 0
-8168  8169 -8170  820 -8173 0

c  -2-1 --> break 
c    ( b^{4, 205}_2 ∧  b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨  b^{4, 205}_0 ∨  p_820 ∨ break
c  in DIMACS:
-8168 -8169  8170  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 205}_2 ∧ -b^{4, 205}_1 ∧ -b^{4, 205}_0 ∧ true) 
c  in CNF:
c    -b^{4, 205}_2 ∨  b^{4, 205}_1 ∨  b^{4, 205}_0 ∨ false 
c  in DIMACS:
-8168  8169  8170  0

c  3 does not represent an automaton state.
c    -(-b^{4, 205}_2 ∧  b^{4, 205}_1 ∧  b^{4, 205}_0 ∧ true) 
c  in CNF:
c     b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ false 
c  in DIMACS:
 8168 -8169 -8170  0
c  -3 does not represent an automaton state.
c    -( b^{4, 205}_2 ∧  b^{4, 205}_1 ∧  b^{4, 205}_0 ∧ true) 
c  in CNF:
c    -b^{4, 205}_2 ∨ -b^{4, 205}_1 ∨ -b^{4, 205}_0 ∨ false 
c  in DIMACS:
-8168 -8169 -8170  0

c i = 206
c  -2+1 --> -1
c    ( b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧  p_824) -> ( b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0)
c  in CNF:
c    -b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨  b^{4, 207}_2
c    -b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_1
c    -b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨  b^{4, 207}_0
c  in DIMACS:
-8171 -8172  8173 -824  8174 0
-8171 -8172  8173 -824 -8175 0
-8171 -8172  8173 -824  8176 0

c  -1+1 --> 0
c    ( b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0 ∧  p_824) -> (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧ -b^{4, 207}_0)
c  in CNF:
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_2
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_1
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_0
c  in DIMACS:
-8171  8172 -8173 -824 -8174 0
-8171  8172 -8173 -824 -8175 0
-8171  8172 -8173 -824 -8176 0

c  0+1 --> 1
c    (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧  p_824) -> (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0)
c  in CNF:
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_2
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_1
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨  b^{4, 207}_0
c  in DIMACS:
 8171  8172  8173 -824 -8174 0
 8171  8172  8173 -824 -8175 0
 8171  8172  8173 -824  8176 0

c  1+1 --> 2
c    (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0 ∧  p_824) -> (-b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0)
c  in CNF:
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_2
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨  b^{4, 207}_1
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ -p_824 ∨ -b^{4, 207}_0
c  in DIMACS:
 8171  8172 -8173 -824 -8174 0
 8171  8172 -8173 -824  8175 0
 8171  8172 -8173 -824 -8176 0

c  2+1 --> break 
c    (-b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧  p_824) -> break
c  in CNF:
c     b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 8171 -8172  8173 -824 1162 0


c  2-1 --> 1
c    (-b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧ -p_824) -> (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0)
c  in CNF:
c     b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_2
c     b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_1
c     b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨  b^{4, 207}_0
c  in DIMACS:
 8171 -8172  8173  824 -8174 0
 8171 -8172  8173  824 -8175 0
 8171 -8172  8173  824  8176 0

c  1-1 --> 0
c    (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0 ∧ -p_824) -> (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧ -b^{4, 207}_0)
c  in CNF:
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_2
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_1
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_0
c  in DIMACS:
 8171  8172 -8173  824 -8174 0
 8171  8172 -8173  824 -8175 0
 8171  8172 -8173  824 -8176 0

c  0-1 --> -1
c    (-b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧ -p_824) -> ( b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0)
c  in CNF:
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨  b^{4, 207}_2
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_1
c     b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨  b^{4, 207}_0
c  in DIMACS:
 8171  8172  8173  824  8174 0
 8171  8172  8173  824 -8175 0
 8171  8172  8173  824  8176 0

c  -1-1 --> -2
c    ( b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧  b^{4, 206}_0 ∧ -p_824) -> ( b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0)
c  in CNF:
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨  b^{4, 207}_2
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨  b^{4, 207}_1
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨  p_824 ∨ -b^{4, 207}_0
c  in DIMACS:
-8171  8172 -8173  824  8174 0
-8171  8172 -8173  824  8175 0
-8171  8172 -8173  824 -8176 0

c  -2-1 --> break 
c    ( b^{4, 206}_2 ∧  b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨  b^{4, 206}_0 ∨  p_824 ∨ break
c  in DIMACS:
-8171 -8172  8173  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 206}_2 ∧ -b^{4, 206}_1 ∧ -b^{4, 206}_0 ∧ true) 
c  in CNF:
c    -b^{4, 206}_2 ∨  b^{4, 206}_1 ∨  b^{4, 206}_0 ∨ false 
c  in DIMACS:
-8171  8172  8173  0

c  3 does not represent an automaton state.
c    -(-b^{4, 206}_2 ∧  b^{4, 206}_1 ∧  b^{4, 206}_0 ∧ true) 
c  in CNF:
c     b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ false 
c  in DIMACS:
 8171 -8172 -8173  0
c  -3 does not represent an automaton state.
c    -( b^{4, 206}_2 ∧  b^{4, 206}_1 ∧  b^{4, 206}_0 ∧ true) 
c  in CNF:
c    -b^{4, 206}_2 ∨ -b^{4, 206}_1 ∨ -b^{4, 206}_0 ∨ false 
c  in DIMACS:
-8171 -8172 -8173  0

c i = 207
c  -2+1 --> -1
c    ( b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧  p_828) -> ( b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0)
c  in CNF:
c    -b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨  b^{4, 208}_2
c    -b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_1
c    -b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨  b^{4, 208}_0
c  in DIMACS:
-8174 -8175  8176 -828  8177 0
-8174 -8175  8176 -828 -8178 0
-8174 -8175  8176 -828  8179 0

c  -1+1 --> 0
c    ( b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0 ∧  p_828) -> (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧ -b^{4, 208}_0)
c  in CNF:
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_2
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_1
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_0
c  in DIMACS:
-8174  8175 -8176 -828 -8177 0
-8174  8175 -8176 -828 -8178 0
-8174  8175 -8176 -828 -8179 0

c  0+1 --> 1
c    (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧  p_828) -> (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0)
c  in CNF:
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_2
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_1
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨  b^{4, 208}_0
c  in DIMACS:
 8174  8175  8176 -828 -8177 0
 8174  8175  8176 -828 -8178 0
 8174  8175  8176 -828  8179 0

c  1+1 --> 2
c    (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0 ∧  p_828) -> (-b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0)
c  in CNF:
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_2
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨  b^{4, 208}_1
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ -p_828 ∨ -b^{4, 208}_0
c  in DIMACS:
 8174  8175 -8176 -828 -8177 0
 8174  8175 -8176 -828  8178 0
 8174  8175 -8176 -828 -8179 0

c  2+1 --> break 
c    (-b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧  p_828) -> break
c  in CNF:
c     b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 8174 -8175  8176 -828 1162 0


c  2-1 --> 1
c    (-b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧ -p_828) -> (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0)
c  in CNF:
c     b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_2
c     b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_1
c     b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨  b^{4, 208}_0
c  in DIMACS:
 8174 -8175  8176  828 -8177 0
 8174 -8175  8176  828 -8178 0
 8174 -8175  8176  828  8179 0

c  1-1 --> 0
c    (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0 ∧ -p_828) -> (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧ -b^{4, 208}_0)
c  in CNF:
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_2
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_1
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_0
c  in DIMACS:
 8174  8175 -8176  828 -8177 0
 8174  8175 -8176  828 -8178 0
 8174  8175 -8176  828 -8179 0

c  0-1 --> -1
c    (-b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧ -p_828) -> ( b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0)
c  in CNF:
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨  b^{4, 208}_2
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_1
c     b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨  b^{4, 208}_0
c  in DIMACS:
 8174  8175  8176  828  8177 0
 8174  8175  8176  828 -8178 0
 8174  8175  8176  828  8179 0

c  -1-1 --> -2
c    ( b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧  b^{4, 207}_0 ∧ -p_828) -> ( b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0)
c  in CNF:
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨  b^{4, 208}_2
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨  b^{4, 208}_1
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨  p_828 ∨ -b^{4, 208}_0
c  in DIMACS:
-8174  8175 -8176  828  8177 0
-8174  8175 -8176  828  8178 0
-8174  8175 -8176  828 -8179 0

c  -2-1 --> break 
c    ( b^{4, 207}_2 ∧  b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨  b^{4, 207}_0 ∨  p_828 ∨ break
c  in DIMACS:
-8174 -8175  8176  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 207}_2 ∧ -b^{4, 207}_1 ∧ -b^{4, 207}_0 ∧ true) 
c  in CNF:
c    -b^{4, 207}_2 ∨  b^{4, 207}_1 ∨  b^{4, 207}_0 ∨ false 
c  in DIMACS:
-8174  8175  8176  0

c  3 does not represent an automaton state.
c    -(-b^{4, 207}_2 ∧  b^{4, 207}_1 ∧  b^{4, 207}_0 ∧ true) 
c  in CNF:
c     b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ false 
c  in DIMACS:
 8174 -8175 -8176  0
c  -3 does not represent an automaton state.
c    -( b^{4, 207}_2 ∧  b^{4, 207}_1 ∧  b^{4, 207}_0 ∧ true) 
c  in CNF:
c    -b^{4, 207}_2 ∨ -b^{4, 207}_1 ∨ -b^{4, 207}_0 ∨ false 
c  in DIMACS:
-8174 -8175 -8176  0

c i = 208
c  -2+1 --> -1
c    ( b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧  p_832) -> ( b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0)
c  in CNF:
c    -b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨  b^{4, 209}_2
c    -b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_1
c    -b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨  b^{4, 209}_0
c  in DIMACS:
-8177 -8178  8179 -832  8180 0
-8177 -8178  8179 -832 -8181 0
-8177 -8178  8179 -832  8182 0

c  -1+1 --> 0
c    ( b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0 ∧  p_832) -> (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧ -b^{4, 209}_0)
c  in CNF:
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_2
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_1
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_0
c  in DIMACS:
-8177  8178 -8179 -832 -8180 0
-8177  8178 -8179 -832 -8181 0
-8177  8178 -8179 -832 -8182 0

c  0+1 --> 1
c    (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧  p_832) -> (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0)
c  in CNF:
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_2
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_1
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨  b^{4, 209}_0
c  in DIMACS:
 8177  8178  8179 -832 -8180 0
 8177  8178  8179 -832 -8181 0
 8177  8178  8179 -832  8182 0

c  1+1 --> 2
c    (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0 ∧  p_832) -> (-b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0)
c  in CNF:
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_2
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨  b^{4, 209}_1
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ -p_832 ∨ -b^{4, 209}_0
c  in DIMACS:
 8177  8178 -8179 -832 -8180 0
 8177  8178 -8179 -832  8181 0
 8177  8178 -8179 -832 -8182 0

c  2+1 --> break 
c    (-b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧  p_832) -> break
c  in CNF:
c     b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 8177 -8178  8179 -832 1162 0


c  2-1 --> 1
c    (-b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧ -p_832) -> (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0)
c  in CNF:
c     b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_2
c     b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_1
c     b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨  b^{4, 209}_0
c  in DIMACS:
 8177 -8178  8179  832 -8180 0
 8177 -8178  8179  832 -8181 0
 8177 -8178  8179  832  8182 0

c  1-1 --> 0
c    (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0 ∧ -p_832) -> (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧ -b^{4, 209}_0)
c  in CNF:
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_2
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_1
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_0
c  in DIMACS:
 8177  8178 -8179  832 -8180 0
 8177  8178 -8179  832 -8181 0
 8177  8178 -8179  832 -8182 0

c  0-1 --> -1
c    (-b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧ -p_832) -> ( b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0)
c  in CNF:
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨  b^{4, 209}_2
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_1
c     b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨  b^{4, 209}_0
c  in DIMACS:
 8177  8178  8179  832  8180 0
 8177  8178  8179  832 -8181 0
 8177  8178  8179  832  8182 0

c  -1-1 --> -2
c    ( b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧  b^{4, 208}_0 ∧ -p_832) -> ( b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0)
c  in CNF:
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨  b^{4, 209}_2
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨  b^{4, 209}_1
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨  p_832 ∨ -b^{4, 209}_0
c  in DIMACS:
-8177  8178 -8179  832  8180 0
-8177  8178 -8179  832  8181 0
-8177  8178 -8179  832 -8182 0

c  -2-1 --> break 
c    ( b^{4, 208}_2 ∧  b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨  b^{4, 208}_0 ∨  p_832 ∨ break
c  in DIMACS:
-8177 -8178  8179  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 208}_2 ∧ -b^{4, 208}_1 ∧ -b^{4, 208}_0 ∧ true) 
c  in CNF:
c    -b^{4, 208}_2 ∨  b^{4, 208}_1 ∨  b^{4, 208}_0 ∨ false 
c  in DIMACS:
-8177  8178  8179  0

c  3 does not represent an automaton state.
c    -(-b^{4, 208}_2 ∧  b^{4, 208}_1 ∧  b^{4, 208}_0 ∧ true) 
c  in CNF:
c     b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ false 
c  in DIMACS:
 8177 -8178 -8179  0
c  -3 does not represent an automaton state.
c    -( b^{4, 208}_2 ∧  b^{4, 208}_1 ∧  b^{4, 208}_0 ∧ true) 
c  in CNF:
c    -b^{4, 208}_2 ∨ -b^{4, 208}_1 ∨ -b^{4, 208}_0 ∨ false 
c  in DIMACS:
-8177 -8178 -8179  0

c i = 209
c  -2+1 --> -1
c    ( b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧  p_836) -> ( b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0)
c  in CNF:
c    -b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨  b^{4, 210}_2
c    -b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_1
c    -b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨  b^{4, 210}_0
c  in DIMACS:
-8180 -8181  8182 -836  8183 0
-8180 -8181  8182 -836 -8184 0
-8180 -8181  8182 -836  8185 0

c  -1+1 --> 0
c    ( b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0 ∧  p_836) -> (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧ -b^{4, 210}_0)
c  in CNF:
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_2
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_1
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_0
c  in DIMACS:
-8180  8181 -8182 -836 -8183 0
-8180  8181 -8182 -836 -8184 0
-8180  8181 -8182 -836 -8185 0

c  0+1 --> 1
c    (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧  p_836) -> (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0)
c  in CNF:
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_2
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_1
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨  b^{4, 210}_0
c  in DIMACS:
 8180  8181  8182 -836 -8183 0
 8180  8181  8182 -836 -8184 0
 8180  8181  8182 -836  8185 0

c  1+1 --> 2
c    (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0 ∧  p_836) -> (-b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0)
c  in CNF:
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_2
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨  b^{4, 210}_1
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ -p_836 ∨ -b^{4, 210}_0
c  in DIMACS:
 8180  8181 -8182 -836 -8183 0
 8180  8181 -8182 -836  8184 0
 8180  8181 -8182 -836 -8185 0

c  2+1 --> break 
c    (-b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧  p_836) -> break
c  in CNF:
c     b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 8180 -8181  8182 -836 1162 0


c  2-1 --> 1
c    (-b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧ -p_836) -> (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0)
c  in CNF:
c     b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_2
c     b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_1
c     b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨  b^{4, 210}_0
c  in DIMACS:
 8180 -8181  8182  836 -8183 0
 8180 -8181  8182  836 -8184 0
 8180 -8181  8182  836  8185 0

c  1-1 --> 0
c    (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0 ∧ -p_836) -> (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧ -b^{4, 210}_0)
c  in CNF:
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_2
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_1
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_0
c  in DIMACS:
 8180  8181 -8182  836 -8183 0
 8180  8181 -8182  836 -8184 0
 8180  8181 -8182  836 -8185 0

c  0-1 --> -1
c    (-b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧ -p_836) -> ( b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0)
c  in CNF:
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨  b^{4, 210}_2
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_1
c     b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨  b^{4, 210}_0
c  in DIMACS:
 8180  8181  8182  836  8183 0
 8180  8181  8182  836 -8184 0
 8180  8181  8182  836  8185 0

c  -1-1 --> -2
c    ( b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧  b^{4, 209}_0 ∧ -p_836) -> ( b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0)
c  in CNF:
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨  b^{4, 210}_2
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨  b^{4, 210}_1
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨  p_836 ∨ -b^{4, 210}_0
c  in DIMACS:
-8180  8181 -8182  836  8183 0
-8180  8181 -8182  836  8184 0
-8180  8181 -8182  836 -8185 0

c  -2-1 --> break 
c    ( b^{4, 209}_2 ∧  b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨  b^{4, 209}_0 ∨  p_836 ∨ break
c  in DIMACS:
-8180 -8181  8182  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 209}_2 ∧ -b^{4, 209}_1 ∧ -b^{4, 209}_0 ∧ true) 
c  in CNF:
c    -b^{4, 209}_2 ∨  b^{4, 209}_1 ∨  b^{4, 209}_0 ∨ false 
c  in DIMACS:
-8180  8181  8182  0

c  3 does not represent an automaton state.
c    -(-b^{4, 209}_2 ∧  b^{4, 209}_1 ∧  b^{4, 209}_0 ∧ true) 
c  in CNF:
c     b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ false 
c  in DIMACS:
 8180 -8181 -8182  0
c  -3 does not represent an automaton state.
c    -( b^{4, 209}_2 ∧  b^{4, 209}_1 ∧  b^{4, 209}_0 ∧ true) 
c  in CNF:
c    -b^{4, 209}_2 ∨ -b^{4, 209}_1 ∨ -b^{4, 209}_0 ∨ false 
c  in DIMACS:
-8180 -8181 -8182  0

c i = 210
c  -2+1 --> -1
c    ( b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧  p_840) -> ( b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0)
c  in CNF:
c    -b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨  b^{4, 211}_2
c    -b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_1
c    -b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨  b^{4, 211}_0
c  in DIMACS:
-8183 -8184  8185 -840  8186 0
-8183 -8184  8185 -840 -8187 0
-8183 -8184  8185 -840  8188 0

c  -1+1 --> 0
c    ( b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0 ∧  p_840) -> (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧ -b^{4, 211}_0)
c  in CNF:
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_2
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_1
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_0
c  in DIMACS:
-8183  8184 -8185 -840 -8186 0
-8183  8184 -8185 -840 -8187 0
-8183  8184 -8185 -840 -8188 0

c  0+1 --> 1
c    (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧  p_840) -> (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0)
c  in CNF:
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_2
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_1
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨  b^{4, 211}_0
c  in DIMACS:
 8183  8184  8185 -840 -8186 0
 8183  8184  8185 -840 -8187 0
 8183  8184  8185 -840  8188 0

c  1+1 --> 2
c    (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0 ∧  p_840) -> (-b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0)
c  in CNF:
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_2
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨  b^{4, 211}_1
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ -p_840 ∨ -b^{4, 211}_0
c  in DIMACS:
 8183  8184 -8185 -840 -8186 0
 8183  8184 -8185 -840  8187 0
 8183  8184 -8185 -840 -8188 0

c  2+1 --> break 
c    (-b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧  p_840) -> break
c  in CNF:
c     b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 8183 -8184  8185 -840 1162 0


c  2-1 --> 1
c    (-b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧ -p_840) -> (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0)
c  in CNF:
c     b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_2
c     b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_1
c     b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨  b^{4, 211}_0
c  in DIMACS:
 8183 -8184  8185  840 -8186 0
 8183 -8184  8185  840 -8187 0
 8183 -8184  8185  840  8188 0

c  1-1 --> 0
c    (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0 ∧ -p_840) -> (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧ -b^{4, 211}_0)
c  in CNF:
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_2
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_1
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_0
c  in DIMACS:
 8183  8184 -8185  840 -8186 0
 8183  8184 -8185  840 -8187 0
 8183  8184 -8185  840 -8188 0

c  0-1 --> -1
c    (-b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧ -p_840) -> ( b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0)
c  in CNF:
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨  b^{4, 211}_2
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_1
c     b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨  b^{4, 211}_0
c  in DIMACS:
 8183  8184  8185  840  8186 0
 8183  8184  8185  840 -8187 0
 8183  8184  8185  840  8188 0

c  -1-1 --> -2
c    ( b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧  b^{4, 210}_0 ∧ -p_840) -> ( b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0)
c  in CNF:
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨  b^{4, 211}_2
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨  b^{4, 211}_1
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨  p_840 ∨ -b^{4, 211}_0
c  in DIMACS:
-8183  8184 -8185  840  8186 0
-8183  8184 -8185  840  8187 0
-8183  8184 -8185  840 -8188 0

c  -2-1 --> break 
c    ( b^{4, 210}_2 ∧  b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨  b^{4, 210}_0 ∨  p_840 ∨ break
c  in DIMACS:
-8183 -8184  8185  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 210}_2 ∧ -b^{4, 210}_1 ∧ -b^{4, 210}_0 ∧ true) 
c  in CNF:
c    -b^{4, 210}_2 ∨  b^{4, 210}_1 ∨  b^{4, 210}_0 ∨ false 
c  in DIMACS:
-8183  8184  8185  0

c  3 does not represent an automaton state.
c    -(-b^{4, 210}_2 ∧  b^{4, 210}_1 ∧  b^{4, 210}_0 ∧ true) 
c  in CNF:
c     b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ false 
c  in DIMACS:
 8183 -8184 -8185  0
c  -3 does not represent an automaton state.
c    -( b^{4, 210}_2 ∧  b^{4, 210}_1 ∧  b^{4, 210}_0 ∧ true) 
c  in CNF:
c    -b^{4, 210}_2 ∨ -b^{4, 210}_1 ∨ -b^{4, 210}_0 ∨ false 
c  in DIMACS:
-8183 -8184 -8185  0

c i = 211
c  -2+1 --> -1
c    ( b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧  p_844) -> ( b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0)
c  in CNF:
c    -b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨  b^{4, 212}_2
c    -b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_1
c    -b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨  b^{4, 212}_0
c  in DIMACS:
-8186 -8187  8188 -844  8189 0
-8186 -8187  8188 -844 -8190 0
-8186 -8187  8188 -844  8191 0

c  -1+1 --> 0
c    ( b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0 ∧  p_844) -> (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧ -b^{4, 212}_0)
c  in CNF:
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_2
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_1
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_0
c  in DIMACS:
-8186  8187 -8188 -844 -8189 0
-8186  8187 -8188 -844 -8190 0
-8186  8187 -8188 -844 -8191 0

c  0+1 --> 1
c    (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧  p_844) -> (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0)
c  in CNF:
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_2
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_1
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨  b^{4, 212}_0
c  in DIMACS:
 8186  8187  8188 -844 -8189 0
 8186  8187  8188 -844 -8190 0
 8186  8187  8188 -844  8191 0

c  1+1 --> 2
c    (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0 ∧  p_844) -> (-b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0)
c  in CNF:
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_2
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨  b^{4, 212}_1
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ -p_844 ∨ -b^{4, 212}_0
c  in DIMACS:
 8186  8187 -8188 -844 -8189 0
 8186  8187 -8188 -844  8190 0
 8186  8187 -8188 -844 -8191 0

c  2+1 --> break 
c    (-b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧  p_844) -> break
c  in CNF:
c     b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ -p_844 ∨ break
c  in DIMACS:
 8186 -8187  8188 -844 1162 0


c  2-1 --> 1
c    (-b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧ -p_844) -> (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0)
c  in CNF:
c     b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_2
c     b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_1
c     b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨  b^{4, 212}_0
c  in DIMACS:
 8186 -8187  8188  844 -8189 0
 8186 -8187  8188  844 -8190 0
 8186 -8187  8188  844  8191 0

c  1-1 --> 0
c    (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0 ∧ -p_844) -> (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧ -b^{4, 212}_0)
c  in CNF:
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_2
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_1
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_0
c  in DIMACS:
 8186  8187 -8188  844 -8189 0
 8186  8187 -8188  844 -8190 0
 8186  8187 -8188  844 -8191 0

c  0-1 --> -1
c    (-b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧ -p_844) -> ( b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0)
c  in CNF:
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨  b^{4, 212}_2
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_1
c     b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨  b^{4, 212}_0
c  in DIMACS:
 8186  8187  8188  844  8189 0
 8186  8187  8188  844 -8190 0
 8186  8187  8188  844  8191 0

c  -1-1 --> -2
c    ( b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧  b^{4, 211}_0 ∧ -p_844) -> ( b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0)
c  in CNF:
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨  b^{4, 212}_2
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨  b^{4, 212}_1
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨  p_844 ∨ -b^{4, 212}_0
c  in DIMACS:
-8186  8187 -8188  844  8189 0
-8186  8187 -8188  844  8190 0
-8186  8187 -8188  844 -8191 0

c  -2-1 --> break 
c    ( b^{4, 211}_2 ∧  b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧ -p_844) -> break
c  in CNF:
c    -b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨  b^{4, 211}_0 ∨  p_844 ∨ break
c  in DIMACS:
-8186 -8187  8188  844 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 211}_2 ∧ -b^{4, 211}_1 ∧ -b^{4, 211}_0 ∧ true) 
c  in CNF:
c    -b^{4, 211}_2 ∨  b^{4, 211}_1 ∨  b^{4, 211}_0 ∨ false 
c  in DIMACS:
-8186  8187  8188  0

c  3 does not represent an automaton state.
c    -(-b^{4, 211}_2 ∧  b^{4, 211}_1 ∧  b^{4, 211}_0 ∧ true) 
c  in CNF:
c     b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ false 
c  in DIMACS:
 8186 -8187 -8188  0
c  -3 does not represent an automaton state.
c    -( b^{4, 211}_2 ∧  b^{4, 211}_1 ∧  b^{4, 211}_0 ∧ true) 
c  in CNF:
c    -b^{4, 211}_2 ∨ -b^{4, 211}_1 ∨ -b^{4, 211}_0 ∨ false 
c  in DIMACS:
-8186 -8187 -8188  0

c i = 212
c  -2+1 --> -1
c    ( b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧  p_848) -> ( b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0)
c  in CNF:
c    -b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨  b^{4, 213}_2
c    -b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_1
c    -b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨  b^{4, 213}_0
c  in DIMACS:
-8189 -8190  8191 -848  8192 0
-8189 -8190  8191 -848 -8193 0
-8189 -8190  8191 -848  8194 0

c  -1+1 --> 0
c    ( b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0 ∧  p_848) -> (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧ -b^{4, 213}_0)
c  in CNF:
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_2
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_1
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_0
c  in DIMACS:
-8189  8190 -8191 -848 -8192 0
-8189  8190 -8191 -848 -8193 0
-8189  8190 -8191 -848 -8194 0

c  0+1 --> 1
c    (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧  p_848) -> (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0)
c  in CNF:
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_2
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_1
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨  b^{4, 213}_0
c  in DIMACS:
 8189  8190  8191 -848 -8192 0
 8189  8190  8191 -848 -8193 0
 8189  8190  8191 -848  8194 0

c  1+1 --> 2
c    (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0 ∧  p_848) -> (-b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0)
c  in CNF:
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_2
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨  b^{4, 213}_1
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ -p_848 ∨ -b^{4, 213}_0
c  in DIMACS:
 8189  8190 -8191 -848 -8192 0
 8189  8190 -8191 -848  8193 0
 8189  8190 -8191 -848 -8194 0

c  2+1 --> break 
c    (-b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧  p_848) -> break
c  in CNF:
c     b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 8189 -8190  8191 -848 1162 0


c  2-1 --> 1
c    (-b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧ -p_848) -> (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0)
c  in CNF:
c     b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_2
c     b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_1
c     b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨  b^{4, 213}_0
c  in DIMACS:
 8189 -8190  8191  848 -8192 0
 8189 -8190  8191  848 -8193 0
 8189 -8190  8191  848  8194 0

c  1-1 --> 0
c    (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0 ∧ -p_848) -> (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧ -b^{4, 213}_0)
c  in CNF:
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_2
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_1
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_0
c  in DIMACS:
 8189  8190 -8191  848 -8192 0
 8189  8190 -8191  848 -8193 0
 8189  8190 -8191  848 -8194 0

c  0-1 --> -1
c    (-b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧ -p_848) -> ( b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0)
c  in CNF:
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨  b^{4, 213}_2
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_1
c     b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨  b^{4, 213}_0
c  in DIMACS:
 8189  8190  8191  848  8192 0
 8189  8190  8191  848 -8193 0
 8189  8190  8191  848  8194 0

c  -1-1 --> -2
c    ( b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧  b^{4, 212}_0 ∧ -p_848) -> ( b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0)
c  in CNF:
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨  b^{4, 213}_2
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨  b^{4, 213}_1
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨  p_848 ∨ -b^{4, 213}_0
c  in DIMACS:
-8189  8190 -8191  848  8192 0
-8189  8190 -8191  848  8193 0
-8189  8190 -8191  848 -8194 0

c  -2-1 --> break 
c    ( b^{4, 212}_2 ∧  b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨  b^{4, 212}_0 ∨  p_848 ∨ break
c  in DIMACS:
-8189 -8190  8191  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 212}_2 ∧ -b^{4, 212}_1 ∧ -b^{4, 212}_0 ∧ true) 
c  in CNF:
c    -b^{4, 212}_2 ∨  b^{4, 212}_1 ∨  b^{4, 212}_0 ∨ false 
c  in DIMACS:
-8189  8190  8191  0

c  3 does not represent an automaton state.
c    -(-b^{4, 212}_2 ∧  b^{4, 212}_1 ∧  b^{4, 212}_0 ∧ true) 
c  in CNF:
c     b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ false 
c  in DIMACS:
 8189 -8190 -8191  0
c  -3 does not represent an automaton state.
c    -( b^{4, 212}_2 ∧  b^{4, 212}_1 ∧  b^{4, 212}_0 ∧ true) 
c  in CNF:
c    -b^{4, 212}_2 ∨ -b^{4, 212}_1 ∨ -b^{4, 212}_0 ∨ false 
c  in DIMACS:
-8189 -8190 -8191  0

c i = 213
c  -2+1 --> -1
c    ( b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧  p_852) -> ( b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0)
c  in CNF:
c    -b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨  b^{4, 214}_2
c    -b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_1
c    -b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨  b^{4, 214}_0
c  in DIMACS:
-8192 -8193  8194 -852  8195 0
-8192 -8193  8194 -852 -8196 0
-8192 -8193  8194 -852  8197 0

c  -1+1 --> 0
c    ( b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0 ∧  p_852) -> (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧ -b^{4, 214}_0)
c  in CNF:
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_2
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_1
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_0
c  in DIMACS:
-8192  8193 -8194 -852 -8195 0
-8192  8193 -8194 -852 -8196 0
-8192  8193 -8194 -852 -8197 0

c  0+1 --> 1
c    (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧  p_852) -> (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0)
c  in CNF:
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_2
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_1
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨  b^{4, 214}_0
c  in DIMACS:
 8192  8193  8194 -852 -8195 0
 8192  8193  8194 -852 -8196 0
 8192  8193  8194 -852  8197 0

c  1+1 --> 2
c    (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0 ∧  p_852) -> (-b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0)
c  in CNF:
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_2
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨  b^{4, 214}_1
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ -p_852 ∨ -b^{4, 214}_0
c  in DIMACS:
 8192  8193 -8194 -852 -8195 0
 8192  8193 -8194 -852  8196 0
 8192  8193 -8194 -852 -8197 0

c  2+1 --> break 
c    (-b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧  p_852) -> break
c  in CNF:
c     b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 8192 -8193  8194 -852 1162 0


c  2-1 --> 1
c    (-b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧ -p_852) -> (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0)
c  in CNF:
c     b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_2
c     b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_1
c     b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨  b^{4, 214}_0
c  in DIMACS:
 8192 -8193  8194  852 -8195 0
 8192 -8193  8194  852 -8196 0
 8192 -8193  8194  852  8197 0

c  1-1 --> 0
c    (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0 ∧ -p_852) -> (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧ -b^{4, 214}_0)
c  in CNF:
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_2
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_1
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_0
c  in DIMACS:
 8192  8193 -8194  852 -8195 0
 8192  8193 -8194  852 -8196 0
 8192  8193 -8194  852 -8197 0

c  0-1 --> -1
c    (-b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧ -p_852) -> ( b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0)
c  in CNF:
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨  b^{4, 214}_2
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_1
c     b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨  b^{4, 214}_0
c  in DIMACS:
 8192  8193  8194  852  8195 0
 8192  8193  8194  852 -8196 0
 8192  8193  8194  852  8197 0

c  -1-1 --> -2
c    ( b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧  b^{4, 213}_0 ∧ -p_852) -> ( b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0)
c  in CNF:
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨  b^{4, 214}_2
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨  b^{4, 214}_1
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨  p_852 ∨ -b^{4, 214}_0
c  in DIMACS:
-8192  8193 -8194  852  8195 0
-8192  8193 -8194  852  8196 0
-8192  8193 -8194  852 -8197 0

c  -2-1 --> break 
c    ( b^{4, 213}_2 ∧  b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨  b^{4, 213}_0 ∨  p_852 ∨ break
c  in DIMACS:
-8192 -8193  8194  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 213}_2 ∧ -b^{4, 213}_1 ∧ -b^{4, 213}_0 ∧ true) 
c  in CNF:
c    -b^{4, 213}_2 ∨  b^{4, 213}_1 ∨  b^{4, 213}_0 ∨ false 
c  in DIMACS:
-8192  8193  8194  0

c  3 does not represent an automaton state.
c    -(-b^{4, 213}_2 ∧  b^{4, 213}_1 ∧  b^{4, 213}_0 ∧ true) 
c  in CNF:
c     b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ false 
c  in DIMACS:
 8192 -8193 -8194  0
c  -3 does not represent an automaton state.
c    -( b^{4, 213}_2 ∧  b^{4, 213}_1 ∧  b^{4, 213}_0 ∧ true) 
c  in CNF:
c    -b^{4, 213}_2 ∨ -b^{4, 213}_1 ∨ -b^{4, 213}_0 ∨ false 
c  in DIMACS:
-8192 -8193 -8194  0

c i = 214
c  -2+1 --> -1
c    ( b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧  p_856) -> ( b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0)
c  in CNF:
c    -b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨  b^{4, 215}_2
c    -b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_1
c    -b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨  b^{4, 215}_0
c  in DIMACS:
-8195 -8196  8197 -856  8198 0
-8195 -8196  8197 -856 -8199 0
-8195 -8196  8197 -856  8200 0

c  -1+1 --> 0
c    ( b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0 ∧  p_856) -> (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧ -b^{4, 215}_0)
c  in CNF:
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_2
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_1
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_0
c  in DIMACS:
-8195  8196 -8197 -856 -8198 0
-8195  8196 -8197 -856 -8199 0
-8195  8196 -8197 -856 -8200 0

c  0+1 --> 1
c    (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧  p_856) -> (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0)
c  in CNF:
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_2
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_1
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨  b^{4, 215}_0
c  in DIMACS:
 8195  8196  8197 -856 -8198 0
 8195  8196  8197 -856 -8199 0
 8195  8196  8197 -856  8200 0

c  1+1 --> 2
c    (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0 ∧  p_856) -> (-b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0)
c  in CNF:
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_2
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨  b^{4, 215}_1
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ -p_856 ∨ -b^{4, 215}_0
c  in DIMACS:
 8195  8196 -8197 -856 -8198 0
 8195  8196 -8197 -856  8199 0
 8195  8196 -8197 -856 -8200 0

c  2+1 --> break 
c    (-b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧  p_856) -> break
c  in CNF:
c     b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 8195 -8196  8197 -856 1162 0


c  2-1 --> 1
c    (-b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧ -p_856) -> (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0)
c  in CNF:
c     b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_2
c     b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_1
c     b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨  b^{4, 215}_0
c  in DIMACS:
 8195 -8196  8197  856 -8198 0
 8195 -8196  8197  856 -8199 0
 8195 -8196  8197  856  8200 0

c  1-1 --> 0
c    (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0 ∧ -p_856) -> (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧ -b^{4, 215}_0)
c  in CNF:
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_2
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_1
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_0
c  in DIMACS:
 8195  8196 -8197  856 -8198 0
 8195  8196 -8197  856 -8199 0
 8195  8196 -8197  856 -8200 0

c  0-1 --> -1
c    (-b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧ -p_856) -> ( b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0)
c  in CNF:
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨  b^{4, 215}_2
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_1
c     b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨  b^{4, 215}_0
c  in DIMACS:
 8195  8196  8197  856  8198 0
 8195  8196  8197  856 -8199 0
 8195  8196  8197  856  8200 0

c  -1-1 --> -2
c    ( b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧  b^{4, 214}_0 ∧ -p_856) -> ( b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0)
c  in CNF:
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨  b^{4, 215}_2
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨  b^{4, 215}_1
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨  p_856 ∨ -b^{4, 215}_0
c  in DIMACS:
-8195  8196 -8197  856  8198 0
-8195  8196 -8197  856  8199 0
-8195  8196 -8197  856 -8200 0

c  -2-1 --> break 
c    ( b^{4, 214}_2 ∧  b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨  b^{4, 214}_0 ∨  p_856 ∨ break
c  in DIMACS:
-8195 -8196  8197  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 214}_2 ∧ -b^{4, 214}_1 ∧ -b^{4, 214}_0 ∧ true) 
c  in CNF:
c    -b^{4, 214}_2 ∨  b^{4, 214}_1 ∨  b^{4, 214}_0 ∨ false 
c  in DIMACS:
-8195  8196  8197  0

c  3 does not represent an automaton state.
c    -(-b^{4, 214}_2 ∧  b^{4, 214}_1 ∧  b^{4, 214}_0 ∧ true) 
c  in CNF:
c     b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ false 
c  in DIMACS:
 8195 -8196 -8197  0
c  -3 does not represent an automaton state.
c    -( b^{4, 214}_2 ∧  b^{4, 214}_1 ∧  b^{4, 214}_0 ∧ true) 
c  in CNF:
c    -b^{4, 214}_2 ∨ -b^{4, 214}_1 ∨ -b^{4, 214}_0 ∨ false 
c  in DIMACS:
-8195 -8196 -8197  0

c i = 215
c  -2+1 --> -1
c    ( b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧  p_860) -> ( b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0)
c  in CNF:
c    -b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨  b^{4, 216}_2
c    -b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_1
c    -b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨  b^{4, 216}_0
c  in DIMACS:
-8198 -8199  8200 -860  8201 0
-8198 -8199  8200 -860 -8202 0
-8198 -8199  8200 -860  8203 0

c  -1+1 --> 0
c    ( b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0 ∧  p_860) -> (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧ -b^{4, 216}_0)
c  in CNF:
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_2
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_1
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_0
c  in DIMACS:
-8198  8199 -8200 -860 -8201 0
-8198  8199 -8200 -860 -8202 0
-8198  8199 -8200 -860 -8203 0

c  0+1 --> 1
c    (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧  p_860) -> (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0)
c  in CNF:
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_2
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_1
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨  b^{4, 216}_0
c  in DIMACS:
 8198  8199  8200 -860 -8201 0
 8198  8199  8200 -860 -8202 0
 8198  8199  8200 -860  8203 0

c  1+1 --> 2
c    (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0 ∧  p_860) -> (-b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0)
c  in CNF:
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_2
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨  b^{4, 216}_1
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ -p_860 ∨ -b^{4, 216}_0
c  in DIMACS:
 8198  8199 -8200 -860 -8201 0
 8198  8199 -8200 -860  8202 0
 8198  8199 -8200 -860 -8203 0

c  2+1 --> break 
c    (-b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧  p_860) -> break
c  in CNF:
c     b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 8198 -8199  8200 -860 1162 0


c  2-1 --> 1
c    (-b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧ -p_860) -> (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0)
c  in CNF:
c     b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_2
c     b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_1
c     b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨  b^{4, 216}_0
c  in DIMACS:
 8198 -8199  8200  860 -8201 0
 8198 -8199  8200  860 -8202 0
 8198 -8199  8200  860  8203 0

c  1-1 --> 0
c    (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0 ∧ -p_860) -> (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧ -b^{4, 216}_0)
c  in CNF:
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_2
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_1
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_0
c  in DIMACS:
 8198  8199 -8200  860 -8201 0
 8198  8199 -8200  860 -8202 0
 8198  8199 -8200  860 -8203 0

c  0-1 --> -1
c    (-b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧ -p_860) -> ( b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0)
c  in CNF:
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨  b^{4, 216}_2
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_1
c     b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨  b^{4, 216}_0
c  in DIMACS:
 8198  8199  8200  860  8201 0
 8198  8199  8200  860 -8202 0
 8198  8199  8200  860  8203 0

c  -1-1 --> -2
c    ( b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧  b^{4, 215}_0 ∧ -p_860) -> ( b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0)
c  in CNF:
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨  b^{4, 216}_2
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨  b^{4, 216}_1
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨  p_860 ∨ -b^{4, 216}_0
c  in DIMACS:
-8198  8199 -8200  860  8201 0
-8198  8199 -8200  860  8202 0
-8198  8199 -8200  860 -8203 0

c  -2-1 --> break 
c    ( b^{4, 215}_2 ∧  b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨  b^{4, 215}_0 ∨  p_860 ∨ break
c  in DIMACS:
-8198 -8199  8200  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 215}_2 ∧ -b^{4, 215}_1 ∧ -b^{4, 215}_0 ∧ true) 
c  in CNF:
c    -b^{4, 215}_2 ∨  b^{4, 215}_1 ∨  b^{4, 215}_0 ∨ false 
c  in DIMACS:
-8198  8199  8200  0

c  3 does not represent an automaton state.
c    -(-b^{4, 215}_2 ∧  b^{4, 215}_1 ∧  b^{4, 215}_0 ∧ true) 
c  in CNF:
c     b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ false 
c  in DIMACS:
 8198 -8199 -8200  0
c  -3 does not represent an automaton state.
c    -( b^{4, 215}_2 ∧  b^{4, 215}_1 ∧  b^{4, 215}_0 ∧ true) 
c  in CNF:
c    -b^{4, 215}_2 ∨ -b^{4, 215}_1 ∨ -b^{4, 215}_0 ∨ false 
c  in DIMACS:
-8198 -8199 -8200  0

c i = 216
c  -2+1 --> -1
c    ( b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧  p_864) -> ( b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0)
c  in CNF:
c    -b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨  b^{4, 217}_2
c    -b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_1
c    -b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨  b^{4, 217}_0
c  in DIMACS:
-8201 -8202  8203 -864  8204 0
-8201 -8202  8203 -864 -8205 0
-8201 -8202  8203 -864  8206 0

c  -1+1 --> 0
c    ( b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0 ∧  p_864) -> (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧ -b^{4, 217}_0)
c  in CNF:
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_2
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_1
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_0
c  in DIMACS:
-8201  8202 -8203 -864 -8204 0
-8201  8202 -8203 -864 -8205 0
-8201  8202 -8203 -864 -8206 0

c  0+1 --> 1
c    (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧  p_864) -> (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0)
c  in CNF:
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_2
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_1
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨  b^{4, 217}_0
c  in DIMACS:
 8201  8202  8203 -864 -8204 0
 8201  8202  8203 -864 -8205 0
 8201  8202  8203 -864  8206 0

c  1+1 --> 2
c    (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0 ∧  p_864) -> (-b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0)
c  in CNF:
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_2
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨  b^{4, 217}_1
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ -p_864 ∨ -b^{4, 217}_0
c  in DIMACS:
 8201  8202 -8203 -864 -8204 0
 8201  8202 -8203 -864  8205 0
 8201  8202 -8203 -864 -8206 0

c  2+1 --> break 
c    (-b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧  p_864) -> break
c  in CNF:
c     b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 8201 -8202  8203 -864 1162 0


c  2-1 --> 1
c    (-b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧ -p_864) -> (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0)
c  in CNF:
c     b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_2
c     b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_1
c     b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨  b^{4, 217}_0
c  in DIMACS:
 8201 -8202  8203  864 -8204 0
 8201 -8202  8203  864 -8205 0
 8201 -8202  8203  864  8206 0

c  1-1 --> 0
c    (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0 ∧ -p_864) -> (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧ -b^{4, 217}_0)
c  in CNF:
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_2
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_1
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_0
c  in DIMACS:
 8201  8202 -8203  864 -8204 0
 8201  8202 -8203  864 -8205 0
 8201  8202 -8203  864 -8206 0

c  0-1 --> -1
c    (-b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧ -p_864) -> ( b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0)
c  in CNF:
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨  b^{4, 217}_2
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_1
c     b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨  b^{4, 217}_0
c  in DIMACS:
 8201  8202  8203  864  8204 0
 8201  8202  8203  864 -8205 0
 8201  8202  8203  864  8206 0

c  -1-1 --> -2
c    ( b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧  b^{4, 216}_0 ∧ -p_864) -> ( b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0)
c  in CNF:
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨  b^{4, 217}_2
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨  b^{4, 217}_1
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨  p_864 ∨ -b^{4, 217}_0
c  in DIMACS:
-8201  8202 -8203  864  8204 0
-8201  8202 -8203  864  8205 0
-8201  8202 -8203  864 -8206 0

c  -2-1 --> break 
c    ( b^{4, 216}_2 ∧  b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨  b^{4, 216}_0 ∨  p_864 ∨ break
c  in DIMACS:
-8201 -8202  8203  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 216}_2 ∧ -b^{4, 216}_1 ∧ -b^{4, 216}_0 ∧ true) 
c  in CNF:
c    -b^{4, 216}_2 ∨  b^{4, 216}_1 ∨  b^{4, 216}_0 ∨ false 
c  in DIMACS:
-8201  8202  8203  0

c  3 does not represent an automaton state.
c    -(-b^{4, 216}_2 ∧  b^{4, 216}_1 ∧  b^{4, 216}_0 ∧ true) 
c  in CNF:
c     b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ false 
c  in DIMACS:
 8201 -8202 -8203  0
c  -3 does not represent an automaton state.
c    -( b^{4, 216}_2 ∧  b^{4, 216}_1 ∧  b^{4, 216}_0 ∧ true) 
c  in CNF:
c    -b^{4, 216}_2 ∨ -b^{4, 216}_1 ∨ -b^{4, 216}_0 ∨ false 
c  in DIMACS:
-8201 -8202 -8203  0

c i = 217
c  -2+1 --> -1
c    ( b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧  p_868) -> ( b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0)
c  in CNF:
c    -b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨  b^{4, 218}_2
c    -b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_1
c    -b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨  b^{4, 218}_0
c  in DIMACS:
-8204 -8205  8206 -868  8207 0
-8204 -8205  8206 -868 -8208 0
-8204 -8205  8206 -868  8209 0

c  -1+1 --> 0
c    ( b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0 ∧  p_868) -> (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧ -b^{4, 218}_0)
c  in CNF:
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_2
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_1
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_0
c  in DIMACS:
-8204  8205 -8206 -868 -8207 0
-8204  8205 -8206 -868 -8208 0
-8204  8205 -8206 -868 -8209 0

c  0+1 --> 1
c    (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧  p_868) -> (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0)
c  in CNF:
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_2
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_1
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨  b^{4, 218}_0
c  in DIMACS:
 8204  8205  8206 -868 -8207 0
 8204  8205  8206 -868 -8208 0
 8204  8205  8206 -868  8209 0

c  1+1 --> 2
c    (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0 ∧  p_868) -> (-b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0)
c  in CNF:
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_2
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨  b^{4, 218}_1
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ -p_868 ∨ -b^{4, 218}_0
c  in DIMACS:
 8204  8205 -8206 -868 -8207 0
 8204  8205 -8206 -868  8208 0
 8204  8205 -8206 -868 -8209 0

c  2+1 --> break 
c    (-b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧  p_868) -> break
c  in CNF:
c     b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 8204 -8205  8206 -868 1162 0


c  2-1 --> 1
c    (-b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧ -p_868) -> (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0)
c  in CNF:
c     b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_2
c     b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_1
c     b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨  b^{4, 218}_0
c  in DIMACS:
 8204 -8205  8206  868 -8207 0
 8204 -8205  8206  868 -8208 0
 8204 -8205  8206  868  8209 0

c  1-1 --> 0
c    (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0 ∧ -p_868) -> (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧ -b^{4, 218}_0)
c  in CNF:
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_2
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_1
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_0
c  in DIMACS:
 8204  8205 -8206  868 -8207 0
 8204  8205 -8206  868 -8208 0
 8204  8205 -8206  868 -8209 0

c  0-1 --> -1
c    (-b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧ -p_868) -> ( b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0)
c  in CNF:
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨  b^{4, 218}_2
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_1
c     b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨  b^{4, 218}_0
c  in DIMACS:
 8204  8205  8206  868  8207 0
 8204  8205  8206  868 -8208 0
 8204  8205  8206  868  8209 0

c  -1-1 --> -2
c    ( b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧  b^{4, 217}_0 ∧ -p_868) -> ( b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0)
c  in CNF:
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨  b^{4, 218}_2
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨  b^{4, 218}_1
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨  p_868 ∨ -b^{4, 218}_0
c  in DIMACS:
-8204  8205 -8206  868  8207 0
-8204  8205 -8206  868  8208 0
-8204  8205 -8206  868 -8209 0

c  -2-1 --> break 
c    ( b^{4, 217}_2 ∧  b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨  b^{4, 217}_0 ∨  p_868 ∨ break
c  in DIMACS:
-8204 -8205  8206  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 217}_2 ∧ -b^{4, 217}_1 ∧ -b^{4, 217}_0 ∧ true) 
c  in CNF:
c    -b^{4, 217}_2 ∨  b^{4, 217}_1 ∨  b^{4, 217}_0 ∨ false 
c  in DIMACS:
-8204  8205  8206  0

c  3 does not represent an automaton state.
c    -(-b^{4, 217}_2 ∧  b^{4, 217}_1 ∧  b^{4, 217}_0 ∧ true) 
c  in CNF:
c     b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ false 
c  in DIMACS:
 8204 -8205 -8206  0
c  -3 does not represent an automaton state.
c    -( b^{4, 217}_2 ∧  b^{4, 217}_1 ∧  b^{4, 217}_0 ∧ true) 
c  in CNF:
c    -b^{4, 217}_2 ∨ -b^{4, 217}_1 ∨ -b^{4, 217}_0 ∨ false 
c  in DIMACS:
-8204 -8205 -8206  0

c i = 218
c  -2+1 --> -1
c    ( b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧  p_872) -> ( b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0)
c  in CNF:
c    -b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨  b^{4, 219}_2
c    -b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_1
c    -b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨  b^{4, 219}_0
c  in DIMACS:
-8207 -8208  8209 -872  8210 0
-8207 -8208  8209 -872 -8211 0
-8207 -8208  8209 -872  8212 0

c  -1+1 --> 0
c    ( b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0 ∧  p_872) -> (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧ -b^{4, 219}_0)
c  in CNF:
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_2
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_1
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_0
c  in DIMACS:
-8207  8208 -8209 -872 -8210 0
-8207  8208 -8209 -872 -8211 0
-8207  8208 -8209 -872 -8212 0

c  0+1 --> 1
c    (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧  p_872) -> (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0)
c  in CNF:
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_2
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_1
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨  b^{4, 219}_0
c  in DIMACS:
 8207  8208  8209 -872 -8210 0
 8207  8208  8209 -872 -8211 0
 8207  8208  8209 -872  8212 0

c  1+1 --> 2
c    (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0 ∧  p_872) -> (-b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0)
c  in CNF:
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_2
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨  b^{4, 219}_1
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ -p_872 ∨ -b^{4, 219}_0
c  in DIMACS:
 8207  8208 -8209 -872 -8210 0
 8207  8208 -8209 -872  8211 0
 8207  8208 -8209 -872 -8212 0

c  2+1 --> break 
c    (-b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧  p_872) -> break
c  in CNF:
c     b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 8207 -8208  8209 -872 1162 0


c  2-1 --> 1
c    (-b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧ -p_872) -> (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0)
c  in CNF:
c     b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_2
c     b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_1
c     b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨  b^{4, 219}_0
c  in DIMACS:
 8207 -8208  8209  872 -8210 0
 8207 -8208  8209  872 -8211 0
 8207 -8208  8209  872  8212 0

c  1-1 --> 0
c    (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0 ∧ -p_872) -> (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧ -b^{4, 219}_0)
c  in CNF:
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_2
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_1
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_0
c  in DIMACS:
 8207  8208 -8209  872 -8210 0
 8207  8208 -8209  872 -8211 0
 8207  8208 -8209  872 -8212 0

c  0-1 --> -1
c    (-b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧ -p_872) -> ( b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0)
c  in CNF:
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨  b^{4, 219}_2
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_1
c     b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨  b^{4, 219}_0
c  in DIMACS:
 8207  8208  8209  872  8210 0
 8207  8208  8209  872 -8211 0
 8207  8208  8209  872  8212 0

c  -1-1 --> -2
c    ( b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧  b^{4, 218}_0 ∧ -p_872) -> ( b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0)
c  in CNF:
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨  b^{4, 219}_2
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨  b^{4, 219}_1
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨  p_872 ∨ -b^{4, 219}_0
c  in DIMACS:
-8207  8208 -8209  872  8210 0
-8207  8208 -8209  872  8211 0
-8207  8208 -8209  872 -8212 0

c  -2-1 --> break 
c    ( b^{4, 218}_2 ∧  b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨  b^{4, 218}_0 ∨  p_872 ∨ break
c  in DIMACS:
-8207 -8208  8209  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 218}_2 ∧ -b^{4, 218}_1 ∧ -b^{4, 218}_0 ∧ true) 
c  in CNF:
c    -b^{4, 218}_2 ∨  b^{4, 218}_1 ∨  b^{4, 218}_0 ∨ false 
c  in DIMACS:
-8207  8208  8209  0

c  3 does not represent an automaton state.
c    -(-b^{4, 218}_2 ∧  b^{4, 218}_1 ∧  b^{4, 218}_0 ∧ true) 
c  in CNF:
c     b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ false 
c  in DIMACS:
 8207 -8208 -8209  0
c  -3 does not represent an automaton state.
c    -( b^{4, 218}_2 ∧  b^{4, 218}_1 ∧  b^{4, 218}_0 ∧ true) 
c  in CNF:
c    -b^{4, 218}_2 ∨ -b^{4, 218}_1 ∨ -b^{4, 218}_0 ∨ false 
c  in DIMACS:
-8207 -8208 -8209  0

c i = 219
c  -2+1 --> -1
c    ( b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧  p_876) -> ( b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0)
c  in CNF:
c    -b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨  b^{4, 220}_2
c    -b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_1
c    -b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨  b^{4, 220}_0
c  in DIMACS:
-8210 -8211  8212 -876  8213 0
-8210 -8211  8212 -876 -8214 0
-8210 -8211  8212 -876  8215 0

c  -1+1 --> 0
c    ( b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0 ∧  p_876) -> (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧ -b^{4, 220}_0)
c  in CNF:
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_2
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_1
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_0
c  in DIMACS:
-8210  8211 -8212 -876 -8213 0
-8210  8211 -8212 -876 -8214 0
-8210  8211 -8212 -876 -8215 0

c  0+1 --> 1
c    (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧  p_876) -> (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0)
c  in CNF:
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_2
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_1
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨  b^{4, 220}_0
c  in DIMACS:
 8210  8211  8212 -876 -8213 0
 8210  8211  8212 -876 -8214 0
 8210  8211  8212 -876  8215 0

c  1+1 --> 2
c    (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0 ∧  p_876) -> (-b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0)
c  in CNF:
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_2
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨  b^{4, 220}_1
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ -p_876 ∨ -b^{4, 220}_0
c  in DIMACS:
 8210  8211 -8212 -876 -8213 0
 8210  8211 -8212 -876  8214 0
 8210  8211 -8212 -876 -8215 0

c  2+1 --> break 
c    (-b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧  p_876) -> break
c  in CNF:
c     b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 8210 -8211  8212 -876 1162 0


c  2-1 --> 1
c    (-b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧ -p_876) -> (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0)
c  in CNF:
c     b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_2
c     b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_1
c     b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨  b^{4, 220}_0
c  in DIMACS:
 8210 -8211  8212  876 -8213 0
 8210 -8211  8212  876 -8214 0
 8210 -8211  8212  876  8215 0

c  1-1 --> 0
c    (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0 ∧ -p_876) -> (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧ -b^{4, 220}_0)
c  in CNF:
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_2
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_1
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_0
c  in DIMACS:
 8210  8211 -8212  876 -8213 0
 8210  8211 -8212  876 -8214 0
 8210  8211 -8212  876 -8215 0

c  0-1 --> -1
c    (-b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧ -p_876) -> ( b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0)
c  in CNF:
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨  b^{4, 220}_2
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_1
c     b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨  b^{4, 220}_0
c  in DIMACS:
 8210  8211  8212  876  8213 0
 8210  8211  8212  876 -8214 0
 8210  8211  8212  876  8215 0

c  -1-1 --> -2
c    ( b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧  b^{4, 219}_0 ∧ -p_876) -> ( b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0)
c  in CNF:
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨  b^{4, 220}_2
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨  b^{4, 220}_1
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨  p_876 ∨ -b^{4, 220}_0
c  in DIMACS:
-8210  8211 -8212  876  8213 0
-8210  8211 -8212  876  8214 0
-8210  8211 -8212  876 -8215 0

c  -2-1 --> break 
c    ( b^{4, 219}_2 ∧  b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨  b^{4, 219}_0 ∨  p_876 ∨ break
c  in DIMACS:
-8210 -8211  8212  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 219}_2 ∧ -b^{4, 219}_1 ∧ -b^{4, 219}_0 ∧ true) 
c  in CNF:
c    -b^{4, 219}_2 ∨  b^{4, 219}_1 ∨  b^{4, 219}_0 ∨ false 
c  in DIMACS:
-8210  8211  8212  0

c  3 does not represent an automaton state.
c    -(-b^{4, 219}_2 ∧  b^{4, 219}_1 ∧  b^{4, 219}_0 ∧ true) 
c  in CNF:
c     b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ false 
c  in DIMACS:
 8210 -8211 -8212  0
c  -3 does not represent an automaton state.
c    -( b^{4, 219}_2 ∧  b^{4, 219}_1 ∧  b^{4, 219}_0 ∧ true) 
c  in CNF:
c    -b^{4, 219}_2 ∨ -b^{4, 219}_1 ∨ -b^{4, 219}_0 ∨ false 
c  in DIMACS:
-8210 -8211 -8212  0

c i = 220
c  -2+1 --> -1
c    ( b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧  p_880) -> ( b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0)
c  in CNF:
c    -b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨  b^{4, 221}_2
c    -b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_1
c    -b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨  b^{4, 221}_0
c  in DIMACS:
-8213 -8214  8215 -880  8216 0
-8213 -8214  8215 -880 -8217 0
-8213 -8214  8215 -880  8218 0

c  -1+1 --> 0
c    ( b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0 ∧  p_880) -> (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧ -b^{4, 221}_0)
c  in CNF:
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_2
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_1
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_0
c  in DIMACS:
-8213  8214 -8215 -880 -8216 0
-8213  8214 -8215 -880 -8217 0
-8213  8214 -8215 -880 -8218 0

c  0+1 --> 1
c    (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧  p_880) -> (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0)
c  in CNF:
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_2
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_1
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨  b^{4, 221}_0
c  in DIMACS:
 8213  8214  8215 -880 -8216 0
 8213  8214  8215 -880 -8217 0
 8213  8214  8215 -880  8218 0

c  1+1 --> 2
c    (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0 ∧  p_880) -> (-b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0)
c  in CNF:
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_2
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨  b^{4, 221}_1
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ -p_880 ∨ -b^{4, 221}_0
c  in DIMACS:
 8213  8214 -8215 -880 -8216 0
 8213  8214 -8215 -880  8217 0
 8213  8214 -8215 -880 -8218 0

c  2+1 --> break 
c    (-b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧  p_880) -> break
c  in CNF:
c     b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 8213 -8214  8215 -880 1162 0


c  2-1 --> 1
c    (-b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧ -p_880) -> (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0)
c  in CNF:
c     b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_2
c     b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_1
c     b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨  b^{4, 221}_0
c  in DIMACS:
 8213 -8214  8215  880 -8216 0
 8213 -8214  8215  880 -8217 0
 8213 -8214  8215  880  8218 0

c  1-1 --> 0
c    (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0 ∧ -p_880) -> (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧ -b^{4, 221}_0)
c  in CNF:
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_2
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_1
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_0
c  in DIMACS:
 8213  8214 -8215  880 -8216 0
 8213  8214 -8215  880 -8217 0
 8213  8214 -8215  880 -8218 0

c  0-1 --> -1
c    (-b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧ -p_880) -> ( b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0)
c  in CNF:
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨  b^{4, 221}_2
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_1
c     b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨  b^{4, 221}_0
c  in DIMACS:
 8213  8214  8215  880  8216 0
 8213  8214  8215  880 -8217 0
 8213  8214  8215  880  8218 0

c  -1-1 --> -2
c    ( b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧  b^{4, 220}_0 ∧ -p_880) -> ( b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0)
c  in CNF:
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨  b^{4, 221}_2
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨  b^{4, 221}_1
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨  p_880 ∨ -b^{4, 221}_0
c  in DIMACS:
-8213  8214 -8215  880  8216 0
-8213  8214 -8215  880  8217 0
-8213  8214 -8215  880 -8218 0

c  -2-1 --> break 
c    ( b^{4, 220}_2 ∧  b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨  b^{4, 220}_0 ∨  p_880 ∨ break
c  in DIMACS:
-8213 -8214  8215  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 220}_2 ∧ -b^{4, 220}_1 ∧ -b^{4, 220}_0 ∧ true) 
c  in CNF:
c    -b^{4, 220}_2 ∨  b^{4, 220}_1 ∨  b^{4, 220}_0 ∨ false 
c  in DIMACS:
-8213  8214  8215  0

c  3 does not represent an automaton state.
c    -(-b^{4, 220}_2 ∧  b^{4, 220}_1 ∧  b^{4, 220}_0 ∧ true) 
c  in CNF:
c     b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ false 
c  in DIMACS:
 8213 -8214 -8215  0
c  -3 does not represent an automaton state.
c    -( b^{4, 220}_2 ∧  b^{4, 220}_1 ∧  b^{4, 220}_0 ∧ true) 
c  in CNF:
c    -b^{4, 220}_2 ∨ -b^{4, 220}_1 ∨ -b^{4, 220}_0 ∨ false 
c  in DIMACS:
-8213 -8214 -8215  0

c i = 221
c  -2+1 --> -1
c    ( b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧  p_884) -> ( b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0)
c  in CNF:
c    -b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨  b^{4, 222}_2
c    -b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_1
c    -b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨  b^{4, 222}_0
c  in DIMACS:
-8216 -8217  8218 -884  8219 0
-8216 -8217  8218 -884 -8220 0
-8216 -8217  8218 -884  8221 0

c  -1+1 --> 0
c    ( b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0 ∧  p_884) -> (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧ -b^{4, 222}_0)
c  in CNF:
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_2
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_1
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_0
c  in DIMACS:
-8216  8217 -8218 -884 -8219 0
-8216  8217 -8218 -884 -8220 0
-8216  8217 -8218 -884 -8221 0

c  0+1 --> 1
c    (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧  p_884) -> (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0)
c  in CNF:
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_2
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_1
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨  b^{4, 222}_0
c  in DIMACS:
 8216  8217  8218 -884 -8219 0
 8216  8217  8218 -884 -8220 0
 8216  8217  8218 -884  8221 0

c  1+1 --> 2
c    (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0 ∧  p_884) -> (-b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0)
c  in CNF:
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_2
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨  b^{4, 222}_1
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ -p_884 ∨ -b^{4, 222}_0
c  in DIMACS:
 8216  8217 -8218 -884 -8219 0
 8216  8217 -8218 -884  8220 0
 8216  8217 -8218 -884 -8221 0

c  2+1 --> break 
c    (-b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧  p_884) -> break
c  in CNF:
c     b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 8216 -8217  8218 -884 1162 0


c  2-1 --> 1
c    (-b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧ -p_884) -> (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0)
c  in CNF:
c     b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_2
c     b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_1
c     b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨  b^{4, 222}_0
c  in DIMACS:
 8216 -8217  8218  884 -8219 0
 8216 -8217  8218  884 -8220 0
 8216 -8217  8218  884  8221 0

c  1-1 --> 0
c    (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0 ∧ -p_884) -> (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧ -b^{4, 222}_0)
c  in CNF:
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_2
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_1
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_0
c  in DIMACS:
 8216  8217 -8218  884 -8219 0
 8216  8217 -8218  884 -8220 0
 8216  8217 -8218  884 -8221 0

c  0-1 --> -1
c    (-b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧ -p_884) -> ( b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0)
c  in CNF:
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨  b^{4, 222}_2
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_1
c     b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨  b^{4, 222}_0
c  in DIMACS:
 8216  8217  8218  884  8219 0
 8216  8217  8218  884 -8220 0
 8216  8217  8218  884  8221 0

c  -1-1 --> -2
c    ( b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧  b^{4, 221}_0 ∧ -p_884) -> ( b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0)
c  in CNF:
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨  b^{4, 222}_2
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨  b^{4, 222}_1
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨  p_884 ∨ -b^{4, 222}_0
c  in DIMACS:
-8216  8217 -8218  884  8219 0
-8216  8217 -8218  884  8220 0
-8216  8217 -8218  884 -8221 0

c  -2-1 --> break 
c    ( b^{4, 221}_2 ∧  b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨  b^{4, 221}_0 ∨  p_884 ∨ break
c  in DIMACS:
-8216 -8217  8218  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 221}_2 ∧ -b^{4, 221}_1 ∧ -b^{4, 221}_0 ∧ true) 
c  in CNF:
c    -b^{4, 221}_2 ∨  b^{4, 221}_1 ∨  b^{4, 221}_0 ∨ false 
c  in DIMACS:
-8216  8217  8218  0

c  3 does not represent an automaton state.
c    -(-b^{4, 221}_2 ∧  b^{4, 221}_1 ∧  b^{4, 221}_0 ∧ true) 
c  in CNF:
c     b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ false 
c  in DIMACS:
 8216 -8217 -8218  0
c  -3 does not represent an automaton state.
c    -( b^{4, 221}_2 ∧  b^{4, 221}_1 ∧  b^{4, 221}_0 ∧ true) 
c  in CNF:
c    -b^{4, 221}_2 ∨ -b^{4, 221}_1 ∨ -b^{4, 221}_0 ∨ false 
c  in DIMACS:
-8216 -8217 -8218  0

c i = 222
c  -2+1 --> -1
c    ( b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧  p_888) -> ( b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0)
c  in CNF:
c    -b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨  b^{4, 223}_2
c    -b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_1
c    -b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨  b^{4, 223}_0
c  in DIMACS:
-8219 -8220  8221 -888  8222 0
-8219 -8220  8221 -888 -8223 0
-8219 -8220  8221 -888  8224 0

c  -1+1 --> 0
c    ( b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0 ∧  p_888) -> (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧ -b^{4, 223}_0)
c  in CNF:
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_2
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_1
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_0
c  in DIMACS:
-8219  8220 -8221 -888 -8222 0
-8219  8220 -8221 -888 -8223 0
-8219  8220 -8221 -888 -8224 0

c  0+1 --> 1
c    (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧  p_888) -> (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0)
c  in CNF:
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_2
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_1
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨  b^{4, 223}_0
c  in DIMACS:
 8219  8220  8221 -888 -8222 0
 8219  8220  8221 -888 -8223 0
 8219  8220  8221 -888  8224 0

c  1+1 --> 2
c    (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0 ∧  p_888) -> (-b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0)
c  in CNF:
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_2
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨  b^{4, 223}_1
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ -p_888 ∨ -b^{4, 223}_0
c  in DIMACS:
 8219  8220 -8221 -888 -8222 0
 8219  8220 -8221 -888  8223 0
 8219  8220 -8221 -888 -8224 0

c  2+1 --> break 
c    (-b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧  p_888) -> break
c  in CNF:
c     b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 8219 -8220  8221 -888 1162 0


c  2-1 --> 1
c    (-b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧ -p_888) -> (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0)
c  in CNF:
c     b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_2
c     b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_1
c     b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨  b^{4, 223}_0
c  in DIMACS:
 8219 -8220  8221  888 -8222 0
 8219 -8220  8221  888 -8223 0
 8219 -8220  8221  888  8224 0

c  1-1 --> 0
c    (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0 ∧ -p_888) -> (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧ -b^{4, 223}_0)
c  in CNF:
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_2
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_1
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_0
c  in DIMACS:
 8219  8220 -8221  888 -8222 0
 8219  8220 -8221  888 -8223 0
 8219  8220 -8221  888 -8224 0

c  0-1 --> -1
c    (-b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧ -p_888) -> ( b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0)
c  in CNF:
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨  b^{4, 223}_2
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_1
c     b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨  b^{4, 223}_0
c  in DIMACS:
 8219  8220  8221  888  8222 0
 8219  8220  8221  888 -8223 0
 8219  8220  8221  888  8224 0

c  -1-1 --> -2
c    ( b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧  b^{4, 222}_0 ∧ -p_888) -> ( b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0)
c  in CNF:
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨  b^{4, 223}_2
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨  b^{4, 223}_1
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨  p_888 ∨ -b^{4, 223}_0
c  in DIMACS:
-8219  8220 -8221  888  8222 0
-8219  8220 -8221  888  8223 0
-8219  8220 -8221  888 -8224 0

c  -2-1 --> break 
c    ( b^{4, 222}_2 ∧  b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨  b^{4, 222}_0 ∨  p_888 ∨ break
c  in DIMACS:
-8219 -8220  8221  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 222}_2 ∧ -b^{4, 222}_1 ∧ -b^{4, 222}_0 ∧ true) 
c  in CNF:
c    -b^{4, 222}_2 ∨  b^{4, 222}_1 ∨  b^{4, 222}_0 ∨ false 
c  in DIMACS:
-8219  8220  8221  0

c  3 does not represent an automaton state.
c    -(-b^{4, 222}_2 ∧  b^{4, 222}_1 ∧  b^{4, 222}_0 ∧ true) 
c  in CNF:
c     b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ false 
c  in DIMACS:
 8219 -8220 -8221  0
c  -3 does not represent an automaton state.
c    -( b^{4, 222}_2 ∧  b^{4, 222}_1 ∧  b^{4, 222}_0 ∧ true) 
c  in CNF:
c    -b^{4, 222}_2 ∨ -b^{4, 222}_1 ∨ -b^{4, 222}_0 ∨ false 
c  in DIMACS:
-8219 -8220 -8221  0

c i = 223
c  -2+1 --> -1
c    ( b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧  p_892) -> ( b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0)
c  in CNF:
c    -b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨  b^{4, 224}_2
c    -b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_1
c    -b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨  b^{4, 224}_0
c  in DIMACS:
-8222 -8223  8224 -892  8225 0
-8222 -8223  8224 -892 -8226 0
-8222 -8223  8224 -892  8227 0

c  -1+1 --> 0
c    ( b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0 ∧  p_892) -> (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧ -b^{4, 224}_0)
c  in CNF:
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_2
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_1
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_0
c  in DIMACS:
-8222  8223 -8224 -892 -8225 0
-8222  8223 -8224 -892 -8226 0
-8222  8223 -8224 -892 -8227 0

c  0+1 --> 1
c    (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧  p_892) -> (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0)
c  in CNF:
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_2
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_1
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨  b^{4, 224}_0
c  in DIMACS:
 8222  8223  8224 -892 -8225 0
 8222  8223  8224 -892 -8226 0
 8222  8223  8224 -892  8227 0

c  1+1 --> 2
c    (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0 ∧  p_892) -> (-b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0)
c  in CNF:
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_2
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨  b^{4, 224}_1
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ -p_892 ∨ -b^{4, 224}_0
c  in DIMACS:
 8222  8223 -8224 -892 -8225 0
 8222  8223 -8224 -892  8226 0
 8222  8223 -8224 -892 -8227 0

c  2+1 --> break 
c    (-b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧  p_892) -> break
c  in CNF:
c     b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ -p_892 ∨ break
c  in DIMACS:
 8222 -8223  8224 -892 1162 0


c  2-1 --> 1
c    (-b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧ -p_892) -> (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0)
c  in CNF:
c     b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_2
c     b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_1
c     b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨  b^{4, 224}_0
c  in DIMACS:
 8222 -8223  8224  892 -8225 0
 8222 -8223  8224  892 -8226 0
 8222 -8223  8224  892  8227 0

c  1-1 --> 0
c    (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0 ∧ -p_892) -> (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧ -b^{4, 224}_0)
c  in CNF:
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_2
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_1
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_0
c  in DIMACS:
 8222  8223 -8224  892 -8225 0
 8222  8223 -8224  892 -8226 0
 8222  8223 -8224  892 -8227 0

c  0-1 --> -1
c    (-b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧ -p_892) -> ( b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0)
c  in CNF:
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨  b^{4, 224}_2
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_1
c     b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨  b^{4, 224}_0
c  in DIMACS:
 8222  8223  8224  892  8225 0
 8222  8223  8224  892 -8226 0
 8222  8223  8224  892  8227 0

c  -1-1 --> -2
c    ( b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧  b^{4, 223}_0 ∧ -p_892) -> ( b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0)
c  in CNF:
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨  b^{4, 224}_2
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨  b^{4, 224}_1
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨  p_892 ∨ -b^{4, 224}_0
c  in DIMACS:
-8222  8223 -8224  892  8225 0
-8222  8223 -8224  892  8226 0
-8222  8223 -8224  892 -8227 0

c  -2-1 --> break 
c    ( b^{4, 223}_2 ∧  b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧ -p_892) -> break
c  in CNF:
c    -b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨  b^{4, 223}_0 ∨  p_892 ∨ break
c  in DIMACS:
-8222 -8223  8224  892 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 223}_2 ∧ -b^{4, 223}_1 ∧ -b^{4, 223}_0 ∧ true) 
c  in CNF:
c    -b^{4, 223}_2 ∨  b^{4, 223}_1 ∨  b^{4, 223}_0 ∨ false 
c  in DIMACS:
-8222  8223  8224  0

c  3 does not represent an automaton state.
c    -(-b^{4, 223}_2 ∧  b^{4, 223}_1 ∧  b^{4, 223}_0 ∧ true) 
c  in CNF:
c     b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ false 
c  in DIMACS:
 8222 -8223 -8224  0
c  -3 does not represent an automaton state.
c    -( b^{4, 223}_2 ∧  b^{4, 223}_1 ∧  b^{4, 223}_0 ∧ true) 
c  in CNF:
c    -b^{4, 223}_2 ∨ -b^{4, 223}_1 ∨ -b^{4, 223}_0 ∨ false 
c  in DIMACS:
-8222 -8223 -8224  0

c i = 224
c  -2+1 --> -1
c    ( b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧  p_896) -> ( b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0)
c  in CNF:
c    -b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨  b^{4, 225}_2
c    -b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_1
c    -b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨  b^{4, 225}_0
c  in DIMACS:
-8225 -8226  8227 -896  8228 0
-8225 -8226  8227 -896 -8229 0
-8225 -8226  8227 -896  8230 0

c  -1+1 --> 0
c    ( b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0 ∧  p_896) -> (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧ -b^{4, 225}_0)
c  in CNF:
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_2
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_1
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_0
c  in DIMACS:
-8225  8226 -8227 -896 -8228 0
-8225  8226 -8227 -896 -8229 0
-8225  8226 -8227 -896 -8230 0

c  0+1 --> 1
c    (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧  p_896) -> (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0)
c  in CNF:
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_2
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_1
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨  b^{4, 225}_0
c  in DIMACS:
 8225  8226  8227 -896 -8228 0
 8225  8226  8227 -896 -8229 0
 8225  8226  8227 -896  8230 0

c  1+1 --> 2
c    (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0 ∧  p_896) -> (-b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0)
c  in CNF:
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_2
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨  b^{4, 225}_1
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ -p_896 ∨ -b^{4, 225}_0
c  in DIMACS:
 8225  8226 -8227 -896 -8228 0
 8225  8226 -8227 -896  8229 0
 8225  8226 -8227 -896 -8230 0

c  2+1 --> break 
c    (-b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧  p_896) -> break
c  in CNF:
c     b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 8225 -8226  8227 -896 1162 0


c  2-1 --> 1
c    (-b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧ -p_896) -> (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0)
c  in CNF:
c     b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_2
c     b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_1
c     b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨  b^{4, 225}_0
c  in DIMACS:
 8225 -8226  8227  896 -8228 0
 8225 -8226  8227  896 -8229 0
 8225 -8226  8227  896  8230 0

c  1-1 --> 0
c    (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0 ∧ -p_896) -> (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧ -b^{4, 225}_0)
c  in CNF:
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_2
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_1
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_0
c  in DIMACS:
 8225  8226 -8227  896 -8228 0
 8225  8226 -8227  896 -8229 0
 8225  8226 -8227  896 -8230 0

c  0-1 --> -1
c    (-b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧ -p_896) -> ( b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0)
c  in CNF:
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨  b^{4, 225}_2
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_1
c     b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨  b^{4, 225}_0
c  in DIMACS:
 8225  8226  8227  896  8228 0
 8225  8226  8227  896 -8229 0
 8225  8226  8227  896  8230 0

c  -1-1 --> -2
c    ( b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧  b^{4, 224}_0 ∧ -p_896) -> ( b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0)
c  in CNF:
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨  b^{4, 225}_2
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨  b^{4, 225}_1
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨  p_896 ∨ -b^{4, 225}_0
c  in DIMACS:
-8225  8226 -8227  896  8228 0
-8225  8226 -8227  896  8229 0
-8225  8226 -8227  896 -8230 0

c  -2-1 --> break 
c    ( b^{4, 224}_2 ∧  b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨  b^{4, 224}_0 ∨  p_896 ∨ break
c  in DIMACS:
-8225 -8226  8227  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 224}_2 ∧ -b^{4, 224}_1 ∧ -b^{4, 224}_0 ∧ true) 
c  in CNF:
c    -b^{4, 224}_2 ∨  b^{4, 224}_1 ∨  b^{4, 224}_0 ∨ false 
c  in DIMACS:
-8225  8226  8227  0

c  3 does not represent an automaton state.
c    -(-b^{4, 224}_2 ∧  b^{4, 224}_1 ∧  b^{4, 224}_0 ∧ true) 
c  in CNF:
c     b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ false 
c  in DIMACS:
 8225 -8226 -8227  0
c  -3 does not represent an automaton state.
c    -( b^{4, 224}_2 ∧  b^{4, 224}_1 ∧  b^{4, 224}_0 ∧ true) 
c  in CNF:
c    -b^{4, 224}_2 ∨ -b^{4, 224}_1 ∨ -b^{4, 224}_0 ∨ false 
c  in DIMACS:
-8225 -8226 -8227  0

c i = 225
c  -2+1 --> -1
c    ( b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧  p_900) -> ( b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0)
c  in CNF:
c    -b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨  b^{4, 226}_2
c    -b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_1
c    -b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨  b^{4, 226}_0
c  in DIMACS:
-8228 -8229  8230 -900  8231 0
-8228 -8229  8230 -900 -8232 0
-8228 -8229  8230 -900  8233 0

c  -1+1 --> 0
c    ( b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0 ∧  p_900) -> (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧ -b^{4, 226}_0)
c  in CNF:
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_2
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_1
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_0
c  in DIMACS:
-8228  8229 -8230 -900 -8231 0
-8228  8229 -8230 -900 -8232 0
-8228  8229 -8230 -900 -8233 0

c  0+1 --> 1
c    (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧  p_900) -> (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0)
c  in CNF:
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_2
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_1
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨  b^{4, 226}_0
c  in DIMACS:
 8228  8229  8230 -900 -8231 0
 8228  8229  8230 -900 -8232 0
 8228  8229  8230 -900  8233 0

c  1+1 --> 2
c    (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0 ∧  p_900) -> (-b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0)
c  in CNF:
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_2
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨  b^{4, 226}_1
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ -p_900 ∨ -b^{4, 226}_0
c  in DIMACS:
 8228  8229 -8230 -900 -8231 0
 8228  8229 -8230 -900  8232 0
 8228  8229 -8230 -900 -8233 0

c  2+1 --> break 
c    (-b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧  p_900) -> break
c  in CNF:
c     b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 8228 -8229  8230 -900 1162 0


c  2-1 --> 1
c    (-b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧ -p_900) -> (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0)
c  in CNF:
c     b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_2
c     b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_1
c     b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨  b^{4, 226}_0
c  in DIMACS:
 8228 -8229  8230  900 -8231 0
 8228 -8229  8230  900 -8232 0
 8228 -8229  8230  900  8233 0

c  1-1 --> 0
c    (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0 ∧ -p_900) -> (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧ -b^{4, 226}_0)
c  in CNF:
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_2
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_1
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_0
c  in DIMACS:
 8228  8229 -8230  900 -8231 0
 8228  8229 -8230  900 -8232 0
 8228  8229 -8230  900 -8233 0

c  0-1 --> -1
c    (-b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧ -p_900) -> ( b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0)
c  in CNF:
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨  b^{4, 226}_2
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_1
c     b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨  b^{4, 226}_0
c  in DIMACS:
 8228  8229  8230  900  8231 0
 8228  8229  8230  900 -8232 0
 8228  8229  8230  900  8233 0

c  -1-1 --> -2
c    ( b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧  b^{4, 225}_0 ∧ -p_900) -> ( b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0)
c  in CNF:
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨  b^{4, 226}_2
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨  b^{4, 226}_1
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨  p_900 ∨ -b^{4, 226}_0
c  in DIMACS:
-8228  8229 -8230  900  8231 0
-8228  8229 -8230  900  8232 0
-8228  8229 -8230  900 -8233 0

c  -2-1 --> break 
c    ( b^{4, 225}_2 ∧  b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨  b^{4, 225}_0 ∨  p_900 ∨ break
c  in DIMACS:
-8228 -8229  8230  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 225}_2 ∧ -b^{4, 225}_1 ∧ -b^{4, 225}_0 ∧ true) 
c  in CNF:
c    -b^{4, 225}_2 ∨  b^{4, 225}_1 ∨  b^{4, 225}_0 ∨ false 
c  in DIMACS:
-8228  8229  8230  0

c  3 does not represent an automaton state.
c    -(-b^{4, 225}_2 ∧  b^{4, 225}_1 ∧  b^{4, 225}_0 ∧ true) 
c  in CNF:
c     b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ false 
c  in DIMACS:
 8228 -8229 -8230  0
c  -3 does not represent an automaton state.
c    -( b^{4, 225}_2 ∧  b^{4, 225}_1 ∧  b^{4, 225}_0 ∧ true) 
c  in CNF:
c    -b^{4, 225}_2 ∨ -b^{4, 225}_1 ∨ -b^{4, 225}_0 ∨ false 
c  in DIMACS:
-8228 -8229 -8230  0

c i = 226
c  -2+1 --> -1
c    ( b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧  p_904) -> ( b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0)
c  in CNF:
c    -b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨  b^{4, 227}_2
c    -b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_1
c    -b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨  b^{4, 227}_0
c  in DIMACS:
-8231 -8232  8233 -904  8234 0
-8231 -8232  8233 -904 -8235 0
-8231 -8232  8233 -904  8236 0

c  -1+1 --> 0
c    ( b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0 ∧  p_904) -> (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧ -b^{4, 227}_0)
c  in CNF:
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_2
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_1
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_0
c  in DIMACS:
-8231  8232 -8233 -904 -8234 0
-8231  8232 -8233 -904 -8235 0
-8231  8232 -8233 -904 -8236 0

c  0+1 --> 1
c    (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧  p_904) -> (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0)
c  in CNF:
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_2
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_1
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨  b^{4, 227}_0
c  in DIMACS:
 8231  8232  8233 -904 -8234 0
 8231  8232  8233 -904 -8235 0
 8231  8232  8233 -904  8236 0

c  1+1 --> 2
c    (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0 ∧  p_904) -> (-b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0)
c  in CNF:
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_2
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨  b^{4, 227}_1
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ -p_904 ∨ -b^{4, 227}_0
c  in DIMACS:
 8231  8232 -8233 -904 -8234 0
 8231  8232 -8233 -904  8235 0
 8231  8232 -8233 -904 -8236 0

c  2+1 --> break 
c    (-b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧  p_904) -> break
c  in CNF:
c     b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 8231 -8232  8233 -904 1162 0


c  2-1 --> 1
c    (-b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧ -p_904) -> (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0)
c  in CNF:
c     b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_2
c     b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_1
c     b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨  b^{4, 227}_0
c  in DIMACS:
 8231 -8232  8233  904 -8234 0
 8231 -8232  8233  904 -8235 0
 8231 -8232  8233  904  8236 0

c  1-1 --> 0
c    (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0 ∧ -p_904) -> (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧ -b^{4, 227}_0)
c  in CNF:
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_2
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_1
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_0
c  in DIMACS:
 8231  8232 -8233  904 -8234 0
 8231  8232 -8233  904 -8235 0
 8231  8232 -8233  904 -8236 0

c  0-1 --> -1
c    (-b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧ -p_904) -> ( b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0)
c  in CNF:
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨  b^{4, 227}_2
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_1
c     b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨  b^{4, 227}_0
c  in DIMACS:
 8231  8232  8233  904  8234 0
 8231  8232  8233  904 -8235 0
 8231  8232  8233  904  8236 0

c  -1-1 --> -2
c    ( b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧  b^{4, 226}_0 ∧ -p_904) -> ( b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0)
c  in CNF:
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨  b^{4, 227}_2
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨  b^{4, 227}_1
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨  p_904 ∨ -b^{4, 227}_0
c  in DIMACS:
-8231  8232 -8233  904  8234 0
-8231  8232 -8233  904  8235 0
-8231  8232 -8233  904 -8236 0

c  -2-1 --> break 
c    ( b^{4, 226}_2 ∧  b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨  b^{4, 226}_0 ∨  p_904 ∨ break
c  in DIMACS:
-8231 -8232  8233  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 226}_2 ∧ -b^{4, 226}_1 ∧ -b^{4, 226}_0 ∧ true) 
c  in CNF:
c    -b^{4, 226}_2 ∨  b^{4, 226}_1 ∨  b^{4, 226}_0 ∨ false 
c  in DIMACS:
-8231  8232  8233  0

c  3 does not represent an automaton state.
c    -(-b^{4, 226}_2 ∧  b^{4, 226}_1 ∧  b^{4, 226}_0 ∧ true) 
c  in CNF:
c     b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ false 
c  in DIMACS:
 8231 -8232 -8233  0
c  -3 does not represent an automaton state.
c    -( b^{4, 226}_2 ∧  b^{4, 226}_1 ∧  b^{4, 226}_0 ∧ true) 
c  in CNF:
c    -b^{4, 226}_2 ∨ -b^{4, 226}_1 ∨ -b^{4, 226}_0 ∨ false 
c  in DIMACS:
-8231 -8232 -8233  0

c i = 227
c  -2+1 --> -1
c    ( b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧  p_908) -> ( b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0)
c  in CNF:
c    -b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨  b^{4, 228}_2
c    -b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_1
c    -b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨  b^{4, 228}_0
c  in DIMACS:
-8234 -8235  8236 -908  8237 0
-8234 -8235  8236 -908 -8238 0
-8234 -8235  8236 -908  8239 0

c  -1+1 --> 0
c    ( b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0 ∧  p_908) -> (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧ -b^{4, 228}_0)
c  in CNF:
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_2
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_1
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_0
c  in DIMACS:
-8234  8235 -8236 -908 -8237 0
-8234  8235 -8236 -908 -8238 0
-8234  8235 -8236 -908 -8239 0

c  0+1 --> 1
c    (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧  p_908) -> (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0)
c  in CNF:
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_2
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_1
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨  b^{4, 228}_0
c  in DIMACS:
 8234  8235  8236 -908 -8237 0
 8234  8235  8236 -908 -8238 0
 8234  8235  8236 -908  8239 0

c  1+1 --> 2
c    (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0 ∧  p_908) -> (-b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0)
c  in CNF:
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_2
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨  b^{4, 228}_1
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ -p_908 ∨ -b^{4, 228}_0
c  in DIMACS:
 8234  8235 -8236 -908 -8237 0
 8234  8235 -8236 -908  8238 0
 8234  8235 -8236 -908 -8239 0

c  2+1 --> break 
c    (-b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧  p_908) -> break
c  in CNF:
c     b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ -p_908 ∨ break
c  in DIMACS:
 8234 -8235  8236 -908 1162 0


c  2-1 --> 1
c    (-b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧ -p_908) -> (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0)
c  in CNF:
c     b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_2
c     b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_1
c     b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨  b^{4, 228}_0
c  in DIMACS:
 8234 -8235  8236  908 -8237 0
 8234 -8235  8236  908 -8238 0
 8234 -8235  8236  908  8239 0

c  1-1 --> 0
c    (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0 ∧ -p_908) -> (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧ -b^{4, 228}_0)
c  in CNF:
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_2
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_1
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_0
c  in DIMACS:
 8234  8235 -8236  908 -8237 0
 8234  8235 -8236  908 -8238 0
 8234  8235 -8236  908 -8239 0

c  0-1 --> -1
c    (-b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧ -p_908) -> ( b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0)
c  in CNF:
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨  b^{4, 228}_2
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_1
c     b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨  b^{4, 228}_0
c  in DIMACS:
 8234  8235  8236  908  8237 0
 8234  8235  8236  908 -8238 0
 8234  8235  8236  908  8239 0

c  -1-1 --> -2
c    ( b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧  b^{4, 227}_0 ∧ -p_908) -> ( b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0)
c  in CNF:
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨  b^{4, 228}_2
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨  b^{4, 228}_1
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨  p_908 ∨ -b^{4, 228}_0
c  in DIMACS:
-8234  8235 -8236  908  8237 0
-8234  8235 -8236  908  8238 0
-8234  8235 -8236  908 -8239 0

c  -2-1 --> break 
c    ( b^{4, 227}_2 ∧  b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧ -p_908) -> break
c  in CNF:
c    -b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨  b^{4, 227}_0 ∨  p_908 ∨ break
c  in DIMACS:
-8234 -8235  8236  908 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 227}_2 ∧ -b^{4, 227}_1 ∧ -b^{4, 227}_0 ∧ true) 
c  in CNF:
c    -b^{4, 227}_2 ∨  b^{4, 227}_1 ∨  b^{4, 227}_0 ∨ false 
c  in DIMACS:
-8234  8235  8236  0

c  3 does not represent an automaton state.
c    -(-b^{4, 227}_2 ∧  b^{4, 227}_1 ∧  b^{4, 227}_0 ∧ true) 
c  in CNF:
c     b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ false 
c  in DIMACS:
 8234 -8235 -8236  0
c  -3 does not represent an automaton state.
c    -( b^{4, 227}_2 ∧  b^{4, 227}_1 ∧  b^{4, 227}_0 ∧ true) 
c  in CNF:
c    -b^{4, 227}_2 ∨ -b^{4, 227}_1 ∨ -b^{4, 227}_0 ∨ false 
c  in DIMACS:
-8234 -8235 -8236  0

c i = 228
c  -2+1 --> -1
c    ( b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧  p_912) -> ( b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0)
c  in CNF:
c    -b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨  b^{4, 229}_2
c    -b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_1
c    -b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨  b^{4, 229}_0
c  in DIMACS:
-8237 -8238  8239 -912  8240 0
-8237 -8238  8239 -912 -8241 0
-8237 -8238  8239 -912  8242 0

c  -1+1 --> 0
c    ( b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0 ∧  p_912) -> (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧ -b^{4, 229}_0)
c  in CNF:
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_2
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_1
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_0
c  in DIMACS:
-8237  8238 -8239 -912 -8240 0
-8237  8238 -8239 -912 -8241 0
-8237  8238 -8239 -912 -8242 0

c  0+1 --> 1
c    (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧  p_912) -> (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0)
c  in CNF:
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_2
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_1
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨  b^{4, 229}_0
c  in DIMACS:
 8237  8238  8239 -912 -8240 0
 8237  8238  8239 -912 -8241 0
 8237  8238  8239 -912  8242 0

c  1+1 --> 2
c    (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0 ∧  p_912) -> (-b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0)
c  in CNF:
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_2
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨  b^{4, 229}_1
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ -p_912 ∨ -b^{4, 229}_0
c  in DIMACS:
 8237  8238 -8239 -912 -8240 0
 8237  8238 -8239 -912  8241 0
 8237  8238 -8239 -912 -8242 0

c  2+1 --> break 
c    (-b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧  p_912) -> break
c  in CNF:
c     b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 8237 -8238  8239 -912 1162 0


c  2-1 --> 1
c    (-b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧ -p_912) -> (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0)
c  in CNF:
c     b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_2
c     b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_1
c     b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨  b^{4, 229}_0
c  in DIMACS:
 8237 -8238  8239  912 -8240 0
 8237 -8238  8239  912 -8241 0
 8237 -8238  8239  912  8242 0

c  1-1 --> 0
c    (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0 ∧ -p_912) -> (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧ -b^{4, 229}_0)
c  in CNF:
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_2
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_1
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_0
c  in DIMACS:
 8237  8238 -8239  912 -8240 0
 8237  8238 -8239  912 -8241 0
 8237  8238 -8239  912 -8242 0

c  0-1 --> -1
c    (-b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧ -p_912) -> ( b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0)
c  in CNF:
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨  b^{4, 229}_2
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_1
c     b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨  b^{4, 229}_0
c  in DIMACS:
 8237  8238  8239  912  8240 0
 8237  8238  8239  912 -8241 0
 8237  8238  8239  912  8242 0

c  -1-1 --> -2
c    ( b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧  b^{4, 228}_0 ∧ -p_912) -> ( b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0)
c  in CNF:
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨  b^{4, 229}_2
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨  b^{4, 229}_1
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨  p_912 ∨ -b^{4, 229}_0
c  in DIMACS:
-8237  8238 -8239  912  8240 0
-8237  8238 -8239  912  8241 0
-8237  8238 -8239  912 -8242 0

c  -2-1 --> break 
c    ( b^{4, 228}_2 ∧  b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨  b^{4, 228}_0 ∨  p_912 ∨ break
c  in DIMACS:
-8237 -8238  8239  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 228}_2 ∧ -b^{4, 228}_1 ∧ -b^{4, 228}_0 ∧ true) 
c  in CNF:
c    -b^{4, 228}_2 ∨  b^{4, 228}_1 ∨  b^{4, 228}_0 ∨ false 
c  in DIMACS:
-8237  8238  8239  0

c  3 does not represent an automaton state.
c    -(-b^{4, 228}_2 ∧  b^{4, 228}_1 ∧  b^{4, 228}_0 ∧ true) 
c  in CNF:
c     b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ false 
c  in DIMACS:
 8237 -8238 -8239  0
c  -3 does not represent an automaton state.
c    -( b^{4, 228}_2 ∧  b^{4, 228}_1 ∧  b^{4, 228}_0 ∧ true) 
c  in CNF:
c    -b^{4, 228}_2 ∨ -b^{4, 228}_1 ∨ -b^{4, 228}_0 ∨ false 
c  in DIMACS:
-8237 -8238 -8239  0

c i = 229
c  -2+1 --> -1
c    ( b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧  p_916) -> ( b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0)
c  in CNF:
c    -b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨  b^{4, 230}_2
c    -b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_1
c    -b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨  b^{4, 230}_0
c  in DIMACS:
-8240 -8241  8242 -916  8243 0
-8240 -8241  8242 -916 -8244 0
-8240 -8241  8242 -916  8245 0

c  -1+1 --> 0
c    ( b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0 ∧  p_916) -> (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧ -b^{4, 230}_0)
c  in CNF:
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_2
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_1
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_0
c  in DIMACS:
-8240  8241 -8242 -916 -8243 0
-8240  8241 -8242 -916 -8244 0
-8240  8241 -8242 -916 -8245 0

c  0+1 --> 1
c    (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧  p_916) -> (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0)
c  in CNF:
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_2
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_1
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨  b^{4, 230}_0
c  in DIMACS:
 8240  8241  8242 -916 -8243 0
 8240  8241  8242 -916 -8244 0
 8240  8241  8242 -916  8245 0

c  1+1 --> 2
c    (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0 ∧  p_916) -> (-b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0)
c  in CNF:
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_2
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨  b^{4, 230}_1
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ -p_916 ∨ -b^{4, 230}_0
c  in DIMACS:
 8240  8241 -8242 -916 -8243 0
 8240  8241 -8242 -916  8244 0
 8240  8241 -8242 -916 -8245 0

c  2+1 --> break 
c    (-b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧  p_916) -> break
c  in CNF:
c     b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ -p_916 ∨ break
c  in DIMACS:
 8240 -8241  8242 -916 1162 0


c  2-1 --> 1
c    (-b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧ -p_916) -> (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0)
c  in CNF:
c     b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_2
c     b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_1
c     b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨  b^{4, 230}_0
c  in DIMACS:
 8240 -8241  8242  916 -8243 0
 8240 -8241  8242  916 -8244 0
 8240 -8241  8242  916  8245 0

c  1-1 --> 0
c    (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0 ∧ -p_916) -> (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧ -b^{4, 230}_0)
c  in CNF:
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_2
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_1
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_0
c  in DIMACS:
 8240  8241 -8242  916 -8243 0
 8240  8241 -8242  916 -8244 0
 8240  8241 -8242  916 -8245 0

c  0-1 --> -1
c    (-b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧ -p_916) -> ( b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0)
c  in CNF:
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨  b^{4, 230}_2
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_1
c     b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨  b^{4, 230}_0
c  in DIMACS:
 8240  8241  8242  916  8243 0
 8240  8241  8242  916 -8244 0
 8240  8241  8242  916  8245 0

c  -1-1 --> -2
c    ( b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧  b^{4, 229}_0 ∧ -p_916) -> ( b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0)
c  in CNF:
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨  b^{4, 230}_2
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨  b^{4, 230}_1
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨  p_916 ∨ -b^{4, 230}_0
c  in DIMACS:
-8240  8241 -8242  916  8243 0
-8240  8241 -8242  916  8244 0
-8240  8241 -8242  916 -8245 0

c  -2-1 --> break 
c    ( b^{4, 229}_2 ∧  b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧ -p_916) -> break
c  in CNF:
c    -b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨  b^{4, 229}_0 ∨  p_916 ∨ break
c  in DIMACS:
-8240 -8241  8242  916 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 229}_2 ∧ -b^{4, 229}_1 ∧ -b^{4, 229}_0 ∧ true) 
c  in CNF:
c    -b^{4, 229}_2 ∨  b^{4, 229}_1 ∨  b^{4, 229}_0 ∨ false 
c  in DIMACS:
-8240  8241  8242  0

c  3 does not represent an automaton state.
c    -(-b^{4, 229}_2 ∧  b^{4, 229}_1 ∧  b^{4, 229}_0 ∧ true) 
c  in CNF:
c     b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ false 
c  in DIMACS:
 8240 -8241 -8242  0
c  -3 does not represent an automaton state.
c    -( b^{4, 229}_2 ∧  b^{4, 229}_1 ∧  b^{4, 229}_0 ∧ true) 
c  in CNF:
c    -b^{4, 229}_2 ∨ -b^{4, 229}_1 ∨ -b^{4, 229}_0 ∨ false 
c  in DIMACS:
-8240 -8241 -8242  0

c i = 230
c  -2+1 --> -1
c    ( b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧  p_920) -> ( b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0)
c  in CNF:
c    -b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨  b^{4, 231}_2
c    -b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_1
c    -b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨  b^{4, 231}_0
c  in DIMACS:
-8243 -8244  8245 -920  8246 0
-8243 -8244  8245 -920 -8247 0
-8243 -8244  8245 -920  8248 0

c  -1+1 --> 0
c    ( b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0 ∧  p_920) -> (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧ -b^{4, 231}_0)
c  in CNF:
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_2
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_1
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_0
c  in DIMACS:
-8243  8244 -8245 -920 -8246 0
-8243  8244 -8245 -920 -8247 0
-8243  8244 -8245 -920 -8248 0

c  0+1 --> 1
c    (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧  p_920) -> (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0)
c  in CNF:
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_2
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_1
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨  b^{4, 231}_0
c  in DIMACS:
 8243  8244  8245 -920 -8246 0
 8243  8244  8245 -920 -8247 0
 8243  8244  8245 -920  8248 0

c  1+1 --> 2
c    (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0 ∧  p_920) -> (-b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0)
c  in CNF:
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_2
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨  b^{4, 231}_1
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ -p_920 ∨ -b^{4, 231}_0
c  in DIMACS:
 8243  8244 -8245 -920 -8246 0
 8243  8244 -8245 -920  8247 0
 8243  8244 -8245 -920 -8248 0

c  2+1 --> break 
c    (-b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧  p_920) -> break
c  in CNF:
c     b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 8243 -8244  8245 -920 1162 0


c  2-1 --> 1
c    (-b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧ -p_920) -> (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0)
c  in CNF:
c     b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_2
c     b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_1
c     b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨  b^{4, 231}_0
c  in DIMACS:
 8243 -8244  8245  920 -8246 0
 8243 -8244  8245  920 -8247 0
 8243 -8244  8245  920  8248 0

c  1-1 --> 0
c    (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0 ∧ -p_920) -> (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧ -b^{4, 231}_0)
c  in CNF:
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_2
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_1
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_0
c  in DIMACS:
 8243  8244 -8245  920 -8246 0
 8243  8244 -8245  920 -8247 0
 8243  8244 -8245  920 -8248 0

c  0-1 --> -1
c    (-b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧ -p_920) -> ( b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0)
c  in CNF:
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨  b^{4, 231}_2
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_1
c     b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨  b^{4, 231}_0
c  in DIMACS:
 8243  8244  8245  920  8246 0
 8243  8244  8245  920 -8247 0
 8243  8244  8245  920  8248 0

c  -1-1 --> -2
c    ( b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧  b^{4, 230}_0 ∧ -p_920) -> ( b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0)
c  in CNF:
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨  b^{4, 231}_2
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨  b^{4, 231}_1
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨  p_920 ∨ -b^{4, 231}_0
c  in DIMACS:
-8243  8244 -8245  920  8246 0
-8243  8244 -8245  920  8247 0
-8243  8244 -8245  920 -8248 0

c  -2-1 --> break 
c    ( b^{4, 230}_2 ∧  b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨  b^{4, 230}_0 ∨  p_920 ∨ break
c  in DIMACS:
-8243 -8244  8245  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 230}_2 ∧ -b^{4, 230}_1 ∧ -b^{4, 230}_0 ∧ true) 
c  in CNF:
c    -b^{4, 230}_2 ∨  b^{4, 230}_1 ∨  b^{4, 230}_0 ∨ false 
c  in DIMACS:
-8243  8244  8245  0

c  3 does not represent an automaton state.
c    -(-b^{4, 230}_2 ∧  b^{4, 230}_1 ∧  b^{4, 230}_0 ∧ true) 
c  in CNF:
c     b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ false 
c  in DIMACS:
 8243 -8244 -8245  0
c  -3 does not represent an automaton state.
c    -( b^{4, 230}_2 ∧  b^{4, 230}_1 ∧  b^{4, 230}_0 ∧ true) 
c  in CNF:
c    -b^{4, 230}_2 ∨ -b^{4, 230}_1 ∨ -b^{4, 230}_0 ∨ false 
c  in DIMACS:
-8243 -8244 -8245  0

c i = 231
c  -2+1 --> -1
c    ( b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧  p_924) -> ( b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0)
c  in CNF:
c    -b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨  b^{4, 232}_2
c    -b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_1
c    -b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨  b^{4, 232}_0
c  in DIMACS:
-8246 -8247  8248 -924  8249 0
-8246 -8247  8248 -924 -8250 0
-8246 -8247  8248 -924  8251 0

c  -1+1 --> 0
c    ( b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0 ∧  p_924) -> (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧ -b^{4, 232}_0)
c  in CNF:
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_2
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_1
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_0
c  in DIMACS:
-8246  8247 -8248 -924 -8249 0
-8246  8247 -8248 -924 -8250 0
-8246  8247 -8248 -924 -8251 0

c  0+1 --> 1
c    (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧  p_924) -> (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0)
c  in CNF:
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_2
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_1
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨  b^{4, 232}_0
c  in DIMACS:
 8246  8247  8248 -924 -8249 0
 8246  8247  8248 -924 -8250 0
 8246  8247  8248 -924  8251 0

c  1+1 --> 2
c    (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0 ∧  p_924) -> (-b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0)
c  in CNF:
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_2
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨  b^{4, 232}_1
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ -p_924 ∨ -b^{4, 232}_0
c  in DIMACS:
 8246  8247 -8248 -924 -8249 0
 8246  8247 -8248 -924  8250 0
 8246  8247 -8248 -924 -8251 0

c  2+1 --> break 
c    (-b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧  p_924) -> break
c  in CNF:
c     b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 8246 -8247  8248 -924 1162 0


c  2-1 --> 1
c    (-b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧ -p_924) -> (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0)
c  in CNF:
c     b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_2
c     b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_1
c     b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨  b^{4, 232}_0
c  in DIMACS:
 8246 -8247  8248  924 -8249 0
 8246 -8247  8248  924 -8250 0
 8246 -8247  8248  924  8251 0

c  1-1 --> 0
c    (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0 ∧ -p_924) -> (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧ -b^{4, 232}_0)
c  in CNF:
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_2
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_1
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_0
c  in DIMACS:
 8246  8247 -8248  924 -8249 0
 8246  8247 -8248  924 -8250 0
 8246  8247 -8248  924 -8251 0

c  0-1 --> -1
c    (-b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧ -p_924) -> ( b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0)
c  in CNF:
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨  b^{4, 232}_2
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_1
c     b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨  b^{4, 232}_0
c  in DIMACS:
 8246  8247  8248  924  8249 0
 8246  8247  8248  924 -8250 0
 8246  8247  8248  924  8251 0

c  -1-1 --> -2
c    ( b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧  b^{4, 231}_0 ∧ -p_924) -> ( b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0)
c  in CNF:
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨  b^{4, 232}_2
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨  b^{4, 232}_1
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨  p_924 ∨ -b^{4, 232}_0
c  in DIMACS:
-8246  8247 -8248  924  8249 0
-8246  8247 -8248  924  8250 0
-8246  8247 -8248  924 -8251 0

c  -2-1 --> break 
c    ( b^{4, 231}_2 ∧  b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨  b^{4, 231}_0 ∨  p_924 ∨ break
c  in DIMACS:
-8246 -8247  8248  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 231}_2 ∧ -b^{4, 231}_1 ∧ -b^{4, 231}_0 ∧ true) 
c  in CNF:
c    -b^{4, 231}_2 ∨  b^{4, 231}_1 ∨  b^{4, 231}_0 ∨ false 
c  in DIMACS:
-8246  8247  8248  0

c  3 does not represent an automaton state.
c    -(-b^{4, 231}_2 ∧  b^{4, 231}_1 ∧  b^{4, 231}_0 ∧ true) 
c  in CNF:
c     b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ false 
c  in DIMACS:
 8246 -8247 -8248  0
c  -3 does not represent an automaton state.
c    -( b^{4, 231}_2 ∧  b^{4, 231}_1 ∧  b^{4, 231}_0 ∧ true) 
c  in CNF:
c    -b^{4, 231}_2 ∨ -b^{4, 231}_1 ∨ -b^{4, 231}_0 ∨ false 
c  in DIMACS:
-8246 -8247 -8248  0

c i = 232
c  -2+1 --> -1
c    ( b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧  p_928) -> ( b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0)
c  in CNF:
c    -b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨  b^{4, 233}_2
c    -b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_1
c    -b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨  b^{4, 233}_0
c  in DIMACS:
-8249 -8250  8251 -928  8252 0
-8249 -8250  8251 -928 -8253 0
-8249 -8250  8251 -928  8254 0

c  -1+1 --> 0
c    ( b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0 ∧  p_928) -> (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧ -b^{4, 233}_0)
c  in CNF:
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_2
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_1
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_0
c  in DIMACS:
-8249  8250 -8251 -928 -8252 0
-8249  8250 -8251 -928 -8253 0
-8249  8250 -8251 -928 -8254 0

c  0+1 --> 1
c    (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧  p_928) -> (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0)
c  in CNF:
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_2
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_1
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨  b^{4, 233}_0
c  in DIMACS:
 8249  8250  8251 -928 -8252 0
 8249  8250  8251 -928 -8253 0
 8249  8250  8251 -928  8254 0

c  1+1 --> 2
c    (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0 ∧  p_928) -> (-b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0)
c  in CNF:
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_2
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨  b^{4, 233}_1
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ -p_928 ∨ -b^{4, 233}_0
c  in DIMACS:
 8249  8250 -8251 -928 -8252 0
 8249  8250 -8251 -928  8253 0
 8249  8250 -8251 -928 -8254 0

c  2+1 --> break 
c    (-b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧  p_928) -> break
c  in CNF:
c     b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 8249 -8250  8251 -928 1162 0


c  2-1 --> 1
c    (-b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧ -p_928) -> (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0)
c  in CNF:
c     b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_2
c     b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_1
c     b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨  b^{4, 233}_0
c  in DIMACS:
 8249 -8250  8251  928 -8252 0
 8249 -8250  8251  928 -8253 0
 8249 -8250  8251  928  8254 0

c  1-1 --> 0
c    (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0 ∧ -p_928) -> (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧ -b^{4, 233}_0)
c  in CNF:
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_2
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_1
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_0
c  in DIMACS:
 8249  8250 -8251  928 -8252 0
 8249  8250 -8251  928 -8253 0
 8249  8250 -8251  928 -8254 0

c  0-1 --> -1
c    (-b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧ -p_928) -> ( b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0)
c  in CNF:
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨  b^{4, 233}_2
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_1
c     b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨  b^{4, 233}_0
c  in DIMACS:
 8249  8250  8251  928  8252 0
 8249  8250  8251  928 -8253 0
 8249  8250  8251  928  8254 0

c  -1-1 --> -2
c    ( b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧  b^{4, 232}_0 ∧ -p_928) -> ( b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0)
c  in CNF:
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨  b^{4, 233}_2
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨  b^{4, 233}_1
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨  p_928 ∨ -b^{4, 233}_0
c  in DIMACS:
-8249  8250 -8251  928  8252 0
-8249  8250 -8251  928  8253 0
-8249  8250 -8251  928 -8254 0

c  -2-1 --> break 
c    ( b^{4, 232}_2 ∧  b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨  b^{4, 232}_0 ∨  p_928 ∨ break
c  in DIMACS:
-8249 -8250  8251  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 232}_2 ∧ -b^{4, 232}_1 ∧ -b^{4, 232}_0 ∧ true) 
c  in CNF:
c    -b^{4, 232}_2 ∨  b^{4, 232}_1 ∨  b^{4, 232}_0 ∨ false 
c  in DIMACS:
-8249  8250  8251  0

c  3 does not represent an automaton state.
c    -(-b^{4, 232}_2 ∧  b^{4, 232}_1 ∧  b^{4, 232}_0 ∧ true) 
c  in CNF:
c     b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ false 
c  in DIMACS:
 8249 -8250 -8251  0
c  -3 does not represent an automaton state.
c    -( b^{4, 232}_2 ∧  b^{4, 232}_1 ∧  b^{4, 232}_0 ∧ true) 
c  in CNF:
c    -b^{4, 232}_2 ∨ -b^{4, 232}_1 ∨ -b^{4, 232}_0 ∨ false 
c  in DIMACS:
-8249 -8250 -8251  0

c i = 233
c  -2+1 --> -1
c    ( b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧  p_932) -> ( b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0)
c  in CNF:
c    -b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨  b^{4, 234}_2
c    -b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_1
c    -b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨  b^{4, 234}_0
c  in DIMACS:
-8252 -8253  8254 -932  8255 0
-8252 -8253  8254 -932 -8256 0
-8252 -8253  8254 -932  8257 0

c  -1+1 --> 0
c    ( b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0 ∧  p_932) -> (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧ -b^{4, 234}_0)
c  in CNF:
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_2
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_1
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_0
c  in DIMACS:
-8252  8253 -8254 -932 -8255 0
-8252  8253 -8254 -932 -8256 0
-8252  8253 -8254 -932 -8257 0

c  0+1 --> 1
c    (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧  p_932) -> (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0)
c  in CNF:
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_2
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_1
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨  b^{4, 234}_0
c  in DIMACS:
 8252  8253  8254 -932 -8255 0
 8252  8253  8254 -932 -8256 0
 8252  8253  8254 -932  8257 0

c  1+1 --> 2
c    (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0 ∧  p_932) -> (-b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0)
c  in CNF:
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_2
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨  b^{4, 234}_1
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ -p_932 ∨ -b^{4, 234}_0
c  in DIMACS:
 8252  8253 -8254 -932 -8255 0
 8252  8253 -8254 -932  8256 0
 8252  8253 -8254 -932 -8257 0

c  2+1 --> break 
c    (-b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧  p_932) -> break
c  in CNF:
c     b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ -p_932 ∨ break
c  in DIMACS:
 8252 -8253  8254 -932 1162 0


c  2-1 --> 1
c    (-b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧ -p_932) -> (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0)
c  in CNF:
c     b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_2
c     b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_1
c     b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨  b^{4, 234}_0
c  in DIMACS:
 8252 -8253  8254  932 -8255 0
 8252 -8253  8254  932 -8256 0
 8252 -8253  8254  932  8257 0

c  1-1 --> 0
c    (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0 ∧ -p_932) -> (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧ -b^{4, 234}_0)
c  in CNF:
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_2
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_1
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_0
c  in DIMACS:
 8252  8253 -8254  932 -8255 0
 8252  8253 -8254  932 -8256 0
 8252  8253 -8254  932 -8257 0

c  0-1 --> -1
c    (-b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧ -p_932) -> ( b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0)
c  in CNF:
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨  b^{4, 234}_2
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_1
c     b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨  b^{4, 234}_0
c  in DIMACS:
 8252  8253  8254  932  8255 0
 8252  8253  8254  932 -8256 0
 8252  8253  8254  932  8257 0

c  -1-1 --> -2
c    ( b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧  b^{4, 233}_0 ∧ -p_932) -> ( b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0)
c  in CNF:
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨  b^{4, 234}_2
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨  b^{4, 234}_1
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨  p_932 ∨ -b^{4, 234}_0
c  in DIMACS:
-8252  8253 -8254  932  8255 0
-8252  8253 -8254  932  8256 0
-8252  8253 -8254  932 -8257 0

c  -2-1 --> break 
c    ( b^{4, 233}_2 ∧  b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧ -p_932) -> break
c  in CNF:
c    -b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨  b^{4, 233}_0 ∨  p_932 ∨ break
c  in DIMACS:
-8252 -8253  8254  932 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 233}_2 ∧ -b^{4, 233}_1 ∧ -b^{4, 233}_0 ∧ true) 
c  in CNF:
c    -b^{4, 233}_2 ∨  b^{4, 233}_1 ∨  b^{4, 233}_0 ∨ false 
c  in DIMACS:
-8252  8253  8254  0

c  3 does not represent an automaton state.
c    -(-b^{4, 233}_2 ∧  b^{4, 233}_1 ∧  b^{4, 233}_0 ∧ true) 
c  in CNF:
c     b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ false 
c  in DIMACS:
 8252 -8253 -8254  0
c  -3 does not represent an automaton state.
c    -( b^{4, 233}_2 ∧  b^{4, 233}_1 ∧  b^{4, 233}_0 ∧ true) 
c  in CNF:
c    -b^{4, 233}_2 ∨ -b^{4, 233}_1 ∨ -b^{4, 233}_0 ∨ false 
c  in DIMACS:
-8252 -8253 -8254  0

c i = 234
c  -2+1 --> -1
c    ( b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧  p_936) -> ( b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0)
c  in CNF:
c    -b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨  b^{4, 235}_2
c    -b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_1
c    -b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨  b^{4, 235}_0
c  in DIMACS:
-8255 -8256  8257 -936  8258 0
-8255 -8256  8257 -936 -8259 0
-8255 -8256  8257 -936  8260 0

c  -1+1 --> 0
c    ( b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0 ∧  p_936) -> (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧ -b^{4, 235}_0)
c  in CNF:
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_2
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_1
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_0
c  in DIMACS:
-8255  8256 -8257 -936 -8258 0
-8255  8256 -8257 -936 -8259 0
-8255  8256 -8257 -936 -8260 0

c  0+1 --> 1
c    (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧  p_936) -> (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0)
c  in CNF:
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_2
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_1
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨  b^{4, 235}_0
c  in DIMACS:
 8255  8256  8257 -936 -8258 0
 8255  8256  8257 -936 -8259 0
 8255  8256  8257 -936  8260 0

c  1+1 --> 2
c    (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0 ∧  p_936) -> (-b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0)
c  in CNF:
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_2
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨  b^{4, 235}_1
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ -p_936 ∨ -b^{4, 235}_0
c  in DIMACS:
 8255  8256 -8257 -936 -8258 0
 8255  8256 -8257 -936  8259 0
 8255  8256 -8257 -936 -8260 0

c  2+1 --> break 
c    (-b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧  p_936) -> break
c  in CNF:
c     b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 8255 -8256  8257 -936 1162 0


c  2-1 --> 1
c    (-b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧ -p_936) -> (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0)
c  in CNF:
c     b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_2
c     b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_1
c     b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨  b^{4, 235}_0
c  in DIMACS:
 8255 -8256  8257  936 -8258 0
 8255 -8256  8257  936 -8259 0
 8255 -8256  8257  936  8260 0

c  1-1 --> 0
c    (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0 ∧ -p_936) -> (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧ -b^{4, 235}_0)
c  in CNF:
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_2
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_1
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_0
c  in DIMACS:
 8255  8256 -8257  936 -8258 0
 8255  8256 -8257  936 -8259 0
 8255  8256 -8257  936 -8260 0

c  0-1 --> -1
c    (-b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧ -p_936) -> ( b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0)
c  in CNF:
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨  b^{4, 235}_2
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_1
c     b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨  b^{4, 235}_0
c  in DIMACS:
 8255  8256  8257  936  8258 0
 8255  8256  8257  936 -8259 0
 8255  8256  8257  936  8260 0

c  -1-1 --> -2
c    ( b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧  b^{4, 234}_0 ∧ -p_936) -> ( b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0)
c  in CNF:
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨  b^{4, 235}_2
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨  b^{4, 235}_1
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨  p_936 ∨ -b^{4, 235}_0
c  in DIMACS:
-8255  8256 -8257  936  8258 0
-8255  8256 -8257  936  8259 0
-8255  8256 -8257  936 -8260 0

c  -2-1 --> break 
c    ( b^{4, 234}_2 ∧  b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨  b^{4, 234}_0 ∨  p_936 ∨ break
c  in DIMACS:
-8255 -8256  8257  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 234}_2 ∧ -b^{4, 234}_1 ∧ -b^{4, 234}_0 ∧ true) 
c  in CNF:
c    -b^{4, 234}_2 ∨  b^{4, 234}_1 ∨  b^{4, 234}_0 ∨ false 
c  in DIMACS:
-8255  8256  8257  0

c  3 does not represent an automaton state.
c    -(-b^{4, 234}_2 ∧  b^{4, 234}_1 ∧  b^{4, 234}_0 ∧ true) 
c  in CNF:
c     b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ false 
c  in DIMACS:
 8255 -8256 -8257  0
c  -3 does not represent an automaton state.
c    -( b^{4, 234}_2 ∧  b^{4, 234}_1 ∧  b^{4, 234}_0 ∧ true) 
c  in CNF:
c    -b^{4, 234}_2 ∨ -b^{4, 234}_1 ∨ -b^{4, 234}_0 ∨ false 
c  in DIMACS:
-8255 -8256 -8257  0

c i = 235
c  -2+1 --> -1
c    ( b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧  p_940) -> ( b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0)
c  in CNF:
c    -b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨  b^{4, 236}_2
c    -b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_1
c    -b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨  b^{4, 236}_0
c  in DIMACS:
-8258 -8259  8260 -940  8261 0
-8258 -8259  8260 -940 -8262 0
-8258 -8259  8260 -940  8263 0

c  -1+1 --> 0
c    ( b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0 ∧  p_940) -> (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧ -b^{4, 236}_0)
c  in CNF:
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_2
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_1
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_0
c  in DIMACS:
-8258  8259 -8260 -940 -8261 0
-8258  8259 -8260 -940 -8262 0
-8258  8259 -8260 -940 -8263 0

c  0+1 --> 1
c    (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧  p_940) -> (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0)
c  in CNF:
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_2
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_1
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨  b^{4, 236}_0
c  in DIMACS:
 8258  8259  8260 -940 -8261 0
 8258  8259  8260 -940 -8262 0
 8258  8259  8260 -940  8263 0

c  1+1 --> 2
c    (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0 ∧  p_940) -> (-b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0)
c  in CNF:
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_2
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨  b^{4, 236}_1
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ -p_940 ∨ -b^{4, 236}_0
c  in DIMACS:
 8258  8259 -8260 -940 -8261 0
 8258  8259 -8260 -940  8262 0
 8258  8259 -8260 -940 -8263 0

c  2+1 --> break 
c    (-b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧  p_940) -> break
c  in CNF:
c     b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 8258 -8259  8260 -940 1162 0


c  2-1 --> 1
c    (-b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧ -p_940) -> (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0)
c  in CNF:
c     b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_2
c     b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_1
c     b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨  b^{4, 236}_0
c  in DIMACS:
 8258 -8259  8260  940 -8261 0
 8258 -8259  8260  940 -8262 0
 8258 -8259  8260  940  8263 0

c  1-1 --> 0
c    (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0 ∧ -p_940) -> (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧ -b^{4, 236}_0)
c  in CNF:
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_2
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_1
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_0
c  in DIMACS:
 8258  8259 -8260  940 -8261 0
 8258  8259 -8260  940 -8262 0
 8258  8259 -8260  940 -8263 0

c  0-1 --> -1
c    (-b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧ -p_940) -> ( b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0)
c  in CNF:
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨  b^{4, 236}_2
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_1
c     b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨  b^{4, 236}_0
c  in DIMACS:
 8258  8259  8260  940  8261 0
 8258  8259  8260  940 -8262 0
 8258  8259  8260  940  8263 0

c  -1-1 --> -2
c    ( b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧  b^{4, 235}_0 ∧ -p_940) -> ( b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0)
c  in CNF:
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨  b^{4, 236}_2
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨  b^{4, 236}_1
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨  p_940 ∨ -b^{4, 236}_0
c  in DIMACS:
-8258  8259 -8260  940  8261 0
-8258  8259 -8260  940  8262 0
-8258  8259 -8260  940 -8263 0

c  -2-1 --> break 
c    ( b^{4, 235}_2 ∧  b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨  b^{4, 235}_0 ∨  p_940 ∨ break
c  in DIMACS:
-8258 -8259  8260  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 235}_2 ∧ -b^{4, 235}_1 ∧ -b^{4, 235}_0 ∧ true) 
c  in CNF:
c    -b^{4, 235}_2 ∨  b^{4, 235}_1 ∨  b^{4, 235}_0 ∨ false 
c  in DIMACS:
-8258  8259  8260  0

c  3 does not represent an automaton state.
c    -(-b^{4, 235}_2 ∧  b^{4, 235}_1 ∧  b^{4, 235}_0 ∧ true) 
c  in CNF:
c     b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ false 
c  in DIMACS:
 8258 -8259 -8260  0
c  -3 does not represent an automaton state.
c    -( b^{4, 235}_2 ∧  b^{4, 235}_1 ∧  b^{4, 235}_0 ∧ true) 
c  in CNF:
c    -b^{4, 235}_2 ∨ -b^{4, 235}_1 ∨ -b^{4, 235}_0 ∨ false 
c  in DIMACS:
-8258 -8259 -8260  0

c i = 236
c  -2+1 --> -1
c    ( b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧  p_944) -> ( b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0)
c  in CNF:
c    -b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨  b^{4, 237}_2
c    -b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_1
c    -b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨  b^{4, 237}_0
c  in DIMACS:
-8261 -8262  8263 -944  8264 0
-8261 -8262  8263 -944 -8265 0
-8261 -8262  8263 -944  8266 0

c  -1+1 --> 0
c    ( b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0 ∧  p_944) -> (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧ -b^{4, 237}_0)
c  in CNF:
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_2
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_1
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_0
c  in DIMACS:
-8261  8262 -8263 -944 -8264 0
-8261  8262 -8263 -944 -8265 0
-8261  8262 -8263 -944 -8266 0

c  0+1 --> 1
c    (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧  p_944) -> (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0)
c  in CNF:
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_2
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_1
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨  b^{4, 237}_0
c  in DIMACS:
 8261  8262  8263 -944 -8264 0
 8261  8262  8263 -944 -8265 0
 8261  8262  8263 -944  8266 0

c  1+1 --> 2
c    (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0 ∧  p_944) -> (-b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0)
c  in CNF:
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_2
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨  b^{4, 237}_1
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ -p_944 ∨ -b^{4, 237}_0
c  in DIMACS:
 8261  8262 -8263 -944 -8264 0
 8261  8262 -8263 -944  8265 0
 8261  8262 -8263 -944 -8266 0

c  2+1 --> break 
c    (-b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧  p_944) -> break
c  in CNF:
c     b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 8261 -8262  8263 -944 1162 0


c  2-1 --> 1
c    (-b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧ -p_944) -> (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0)
c  in CNF:
c     b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_2
c     b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_1
c     b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨  b^{4, 237}_0
c  in DIMACS:
 8261 -8262  8263  944 -8264 0
 8261 -8262  8263  944 -8265 0
 8261 -8262  8263  944  8266 0

c  1-1 --> 0
c    (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0 ∧ -p_944) -> (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧ -b^{4, 237}_0)
c  in CNF:
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_2
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_1
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_0
c  in DIMACS:
 8261  8262 -8263  944 -8264 0
 8261  8262 -8263  944 -8265 0
 8261  8262 -8263  944 -8266 0

c  0-1 --> -1
c    (-b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧ -p_944) -> ( b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0)
c  in CNF:
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨  b^{4, 237}_2
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_1
c     b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨  b^{4, 237}_0
c  in DIMACS:
 8261  8262  8263  944  8264 0
 8261  8262  8263  944 -8265 0
 8261  8262  8263  944  8266 0

c  -1-1 --> -2
c    ( b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧  b^{4, 236}_0 ∧ -p_944) -> ( b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0)
c  in CNF:
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨  b^{4, 237}_2
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨  b^{4, 237}_1
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨  p_944 ∨ -b^{4, 237}_0
c  in DIMACS:
-8261  8262 -8263  944  8264 0
-8261  8262 -8263  944  8265 0
-8261  8262 -8263  944 -8266 0

c  -2-1 --> break 
c    ( b^{4, 236}_2 ∧  b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨  b^{4, 236}_0 ∨  p_944 ∨ break
c  in DIMACS:
-8261 -8262  8263  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 236}_2 ∧ -b^{4, 236}_1 ∧ -b^{4, 236}_0 ∧ true) 
c  in CNF:
c    -b^{4, 236}_2 ∨  b^{4, 236}_1 ∨  b^{4, 236}_0 ∨ false 
c  in DIMACS:
-8261  8262  8263  0

c  3 does not represent an automaton state.
c    -(-b^{4, 236}_2 ∧  b^{4, 236}_1 ∧  b^{4, 236}_0 ∧ true) 
c  in CNF:
c     b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ false 
c  in DIMACS:
 8261 -8262 -8263  0
c  -3 does not represent an automaton state.
c    -( b^{4, 236}_2 ∧  b^{4, 236}_1 ∧  b^{4, 236}_0 ∧ true) 
c  in CNF:
c    -b^{4, 236}_2 ∨ -b^{4, 236}_1 ∨ -b^{4, 236}_0 ∨ false 
c  in DIMACS:
-8261 -8262 -8263  0

c i = 237
c  -2+1 --> -1
c    ( b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧  p_948) -> ( b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0)
c  in CNF:
c    -b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨  b^{4, 238}_2
c    -b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_1
c    -b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨  b^{4, 238}_0
c  in DIMACS:
-8264 -8265  8266 -948  8267 0
-8264 -8265  8266 -948 -8268 0
-8264 -8265  8266 -948  8269 0

c  -1+1 --> 0
c    ( b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0 ∧  p_948) -> (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧ -b^{4, 238}_0)
c  in CNF:
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_2
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_1
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_0
c  in DIMACS:
-8264  8265 -8266 -948 -8267 0
-8264  8265 -8266 -948 -8268 0
-8264  8265 -8266 -948 -8269 0

c  0+1 --> 1
c    (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧  p_948) -> (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0)
c  in CNF:
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_2
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_1
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨  b^{4, 238}_0
c  in DIMACS:
 8264  8265  8266 -948 -8267 0
 8264  8265  8266 -948 -8268 0
 8264  8265  8266 -948  8269 0

c  1+1 --> 2
c    (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0 ∧  p_948) -> (-b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0)
c  in CNF:
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_2
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨  b^{4, 238}_1
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ -p_948 ∨ -b^{4, 238}_0
c  in DIMACS:
 8264  8265 -8266 -948 -8267 0
 8264  8265 -8266 -948  8268 0
 8264  8265 -8266 -948 -8269 0

c  2+1 --> break 
c    (-b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧  p_948) -> break
c  in CNF:
c     b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 8264 -8265  8266 -948 1162 0


c  2-1 --> 1
c    (-b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧ -p_948) -> (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0)
c  in CNF:
c     b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_2
c     b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_1
c     b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨  b^{4, 238}_0
c  in DIMACS:
 8264 -8265  8266  948 -8267 0
 8264 -8265  8266  948 -8268 0
 8264 -8265  8266  948  8269 0

c  1-1 --> 0
c    (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0 ∧ -p_948) -> (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧ -b^{4, 238}_0)
c  in CNF:
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_2
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_1
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_0
c  in DIMACS:
 8264  8265 -8266  948 -8267 0
 8264  8265 -8266  948 -8268 0
 8264  8265 -8266  948 -8269 0

c  0-1 --> -1
c    (-b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧ -p_948) -> ( b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0)
c  in CNF:
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨  b^{4, 238}_2
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_1
c     b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨  b^{4, 238}_0
c  in DIMACS:
 8264  8265  8266  948  8267 0
 8264  8265  8266  948 -8268 0
 8264  8265  8266  948  8269 0

c  -1-1 --> -2
c    ( b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧  b^{4, 237}_0 ∧ -p_948) -> ( b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0)
c  in CNF:
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨  b^{4, 238}_2
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨  b^{4, 238}_1
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨  p_948 ∨ -b^{4, 238}_0
c  in DIMACS:
-8264  8265 -8266  948  8267 0
-8264  8265 -8266  948  8268 0
-8264  8265 -8266  948 -8269 0

c  -2-1 --> break 
c    ( b^{4, 237}_2 ∧  b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨  b^{4, 237}_0 ∨  p_948 ∨ break
c  in DIMACS:
-8264 -8265  8266  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 237}_2 ∧ -b^{4, 237}_1 ∧ -b^{4, 237}_0 ∧ true) 
c  in CNF:
c    -b^{4, 237}_2 ∨  b^{4, 237}_1 ∨  b^{4, 237}_0 ∨ false 
c  in DIMACS:
-8264  8265  8266  0

c  3 does not represent an automaton state.
c    -(-b^{4, 237}_2 ∧  b^{4, 237}_1 ∧  b^{4, 237}_0 ∧ true) 
c  in CNF:
c     b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ false 
c  in DIMACS:
 8264 -8265 -8266  0
c  -3 does not represent an automaton state.
c    -( b^{4, 237}_2 ∧  b^{4, 237}_1 ∧  b^{4, 237}_0 ∧ true) 
c  in CNF:
c    -b^{4, 237}_2 ∨ -b^{4, 237}_1 ∨ -b^{4, 237}_0 ∨ false 
c  in DIMACS:
-8264 -8265 -8266  0

c i = 238
c  -2+1 --> -1
c    ( b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧  p_952) -> ( b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0)
c  in CNF:
c    -b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨  b^{4, 239}_2
c    -b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_1
c    -b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨  b^{4, 239}_0
c  in DIMACS:
-8267 -8268  8269 -952  8270 0
-8267 -8268  8269 -952 -8271 0
-8267 -8268  8269 -952  8272 0

c  -1+1 --> 0
c    ( b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0 ∧  p_952) -> (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧ -b^{4, 239}_0)
c  in CNF:
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_2
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_1
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_0
c  in DIMACS:
-8267  8268 -8269 -952 -8270 0
-8267  8268 -8269 -952 -8271 0
-8267  8268 -8269 -952 -8272 0

c  0+1 --> 1
c    (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧  p_952) -> (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0)
c  in CNF:
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_2
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_1
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨  b^{4, 239}_0
c  in DIMACS:
 8267  8268  8269 -952 -8270 0
 8267  8268  8269 -952 -8271 0
 8267  8268  8269 -952  8272 0

c  1+1 --> 2
c    (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0 ∧  p_952) -> (-b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0)
c  in CNF:
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_2
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨  b^{4, 239}_1
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ -p_952 ∨ -b^{4, 239}_0
c  in DIMACS:
 8267  8268 -8269 -952 -8270 0
 8267  8268 -8269 -952  8271 0
 8267  8268 -8269 -952 -8272 0

c  2+1 --> break 
c    (-b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧  p_952) -> break
c  in CNF:
c     b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 8267 -8268  8269 -952 1162 0


c  2-1 --> 1
c    (-b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧ -p_952) -> (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0)
c  in CNF:
c     b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_2
c     b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_1
c     b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨  b^{4, 239}_0
c  in DIMACS:
 8267 -8268  8269  952 -8270 0
 8267 -8268  8269  952 -8271 0
 8267 -8268  8269  952  8272 0

c  1-1 --> 0
c    (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0 ∧ -p_952) -> (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧ -b^{4, 239}_0)
c  in CNF:
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_2
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_1
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_0
c  in DIMACS:
 8267  8268 -8269  952 -8270 0
 8267  8268 -8269  952 -8271 0
 8267  8268 -8269  952 -8272 0

c  0-1 --> -1
c    (-b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧ -p_952) -> ( b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0)
c  in CNF:
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨  b^{4, 239}_2
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_1
c     b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨  b^{4, 239}_0
c  in DIMACS:
 8267  8268  8269  952  8270 0
 8267  8268  8269  952 -8271 0
 8267  8268  8269  952  8272 0

c  -1-1 --> -2
c    ( b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧  b^{4, 238}_0 ∧ -p_952) -> ( b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0)
c  in CNF:
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨  b^{4, 239}_2
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨  b^{4, 239}_1
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨  p_952 ∨ -b^{4, 239}_0
c  in DIMACS:
-8267  8268 -8269  952  8270 0
-8267  8268 -8269  952  8271 0
-8267  8268 -8269  952 -8272 0

c  -2-1 --> break 
c    ( b^{4, 238}_2 ∧  b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨  b^{4, 238}_0 ∨  p_952 ∨ break
c  in DIMACS:
-8267 -8268  8269  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 238}_2 ∧ -b^{4, 238}_1 ∧ -b^{4, 238}_0 ∧ true) 
c  in CNF:
c    -b^{4, 238}_2 ∨  b^{4, 238}_1 ∨  b^{4, 238}_0 ∨ false 
c  in DIMACS:
-8267  8268  8269  0

c  3 does not represent an automaton state.
c    -(-b^{4, 238}_2 ∧  b^{4, 238}_1 ∧  b^{4, 238}_0 ∧ true) 
c  in CNF:
c     b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ false 
c  in DIMACS:
 8267 -8268 -8269  0
c  -3 does not represent an automaton state.
c    -( b^{4, 238}_2 ∧  b^{4, 238}_1 ∧  b^{4, 238}_0 ∧ true) 
c  in CNF:
c    -b^{4, 238}_2 ∨ -b^{4, 238}_1 ∨ -b^{4, 238}_0 ∨ false 
c  in DIMACS:
-8267 -8268 -8269  0

c i = 239
c  -2+1 --> -1
c    ( b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧  p_956) -> ( b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0)
c  in CNF:
c    -b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨  b^{4, 240}_2
c    -b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_1
c    -b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨  b^{4, 240}_0
c  in DIMACS:
-8270 -8271  8272 -956  8273 0
-8270 -8271  8272 -956 -8274 0
-8270 -8271  8272 -956  8275 0

c  -1+1 --> 0
c    ( b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0 ∧  p_956) -> (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧ -b^{4, 240}_0)
c  in CNF:
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_2
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_1
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_0
c  in DIMACS:
-8270  8271 -8272 -956 -8273 0
-8270  8271 -8272 -956 -8274 0
-8270  8271 -8272 -956 -8275 0

c  0+1 --> 1
c    (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧  p_956) -> (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0)
c  in CNF:
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_2
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_1
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨  b^{4, 240}_0
c  in DIMACS:
 8270  8271  8272 -956 -8273 0
 8270  8271  8272 -956 -8274 0
 8270  8271  8272 -956  8275 0

c  1+1 --> 2
c    (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0 ∧  p_956) -> (-b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0)
c  in CNF:
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_2
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨  b^{4, 240}_1
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ -p_956 ∨ -b^{4, 240}_0
c  in DIMACS:
 8270  8271 -8272 -956 -8273 0
 8270  8271 -8272 -956  8274 0
 8270  8271 -8272 -956 -8275 0

c  2+1 --> break 
c    (-b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧  p_956) -> break
c  in CNF:
c     b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ -p_956 ∨ break
c  in DIMACS:
 8270 -8271  8272 -956 1162 0


c  2-1 --> 1
c    (-b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧ -p_956) -> (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0)
c  in CNF:
c     b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_2
c     b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_1
c     b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨  b^{4, 240}_0
c  in DIMACS:
 8270 -8271  8272  956 -8273 0
 8270 -8271  8272  956 -8274 0
 8270 -8271  8272  956  8275 0

c  1-1 --> 0
c    (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0 ∧ -p_956) -> (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧ -b^{4, 240}_0)
c  in CNF:
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_2
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_1
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_0
c  in DIMACS:
 8270  8271 -8272  956 -8273 0
 8270  8271 -8272  956 -8274 0
 8270  8271 -8272  956 -8275 0

c  0-1 --> -1
c    (-b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧ -p_956) -> ( b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0)
c  in CNF:
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨  b^{4, 240}_2
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_1
c     b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨  b^{4, 240}_0
c  in DIMACS:
 8270  8271  8272  956  8273 0
 8270  8271  8272  956 -8274 0
 8270  8271  8272  956  8275 0

c  -1-1 --> -2
c    ( b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧  b^{4, 239}_0 ∧ -p_956) -> ( b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0)
c  in CNF:
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨  b^{4, 240}_2
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨  b^{4, 240}_1
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨  p_956 ∨ -b^{4, 240}_0
c  in DIMACS:
-8270  8271 -8272  956  8273 0
-8270  8271 -8272  956  8274 0
-8270  8271 -8272  956 -8275 0

c  -2-1 --> break 
c    ( b^{4, 239}_2 ∧  b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧ -p_956) -> break
c  in CNF:
c    -b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨  b^{4, 239}_0 ∨  p_956 ∨ break
c  in DIMACS:
-8270 -8271  8272  956 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 239}_2 ∧ -b^{4, 239}_1 ∧ -b^{4, 239}_0 ∧ true) 
c  in CNF:
c    -b^{4, 239}_2 ∨  b^{4, 239}_1 ∨  b^{4, 239}_0 ∨ false 
c  in DIMACS:
-8270  8271  8272  0

c  3 does not represent an automaton state.
c    -(-b^{4, 239}_2 ∧  b^{4, 239}_1 ∧  b^{4, 239}_0 ∧ true) 
c  in CNF:
c     b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ false 
c  in DIMACS:
 8270 -8271 -8272  0
c  -3 does not represent an automaton state.
c    -( b^{4, 239}_2 ∧  b^{4, 239}_1 ∧  b^{4, 239}_0 ∧ true) 
c  in CNF:
c    -b^{4, 239}_2 ∨ -b^{4, 239}_1 ∨ -b^{4, 239}_0 ∨ false 
c  in DIMACS:
-8270 -8271 -8272  0

c i = 240
c  -2+1 --> -1
c    ( b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧  p_960) -> ( b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0)
c  in CNF:
c    -b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨  b^{4, 241}_2
c    -b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_1
c    -b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨  b^{4, 241}_0
c  in DIMACS:
-8273 -8274  8275 -960  8276 0
-8273 -8274  8275 -960 -8277 0
-8273 -8274  8275 -960  8278 0

c  -1+1 --> 0
c    ( b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0 ∧  p_960) -> (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧ -b^{4, 241}_0)
c  in CNF:
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_2
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_1
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_0
c  in DIMACS:
-8273  8274 -8275 -960 -8276 0
-8273  8274 -8275 -960 -8277 0
-8273  8274 -8275 -960 -8278 0

c  0+1 --> 1
c    (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧  p_960) -> (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0)
c  in CNF:
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_2
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_1
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨  b^{4, 241}_0
c  in DIMACS:
 8273  8274  8275 -960 -8276 0
 8273  8274  8275 -960 -8277 0
 8273  8274  8275 -960  8278 0

c  1+1 --> 2
c    (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0 ∧  p_960) -> (-b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0)
c  in CNF:
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_2
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨  b^{4, 241}_1
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ -p_960 ∨ -b^{4, 241}_0
c  in DIMACS:
 8273  8274 -8275 -960 -8276 0
 8273  8274 -8275 -960  8277 0
 8273  8274 -8275 -960 -8278 0

c  2+1 --> break 
c    (-b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧  p_960) -> break
c  in CNF:
c     b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 8273 -8274  8275 -960 1162 0


c  2-1 --> 1
c    (-b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧ -p_960) -> (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0)
c  in CNF:
c     b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_2
c     b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_1
c     b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨  b^{4, 241}_0
c  in DIMACS:
 8273 -8274  8275  960 -8276 0
 8273 -8274  8275  960 -8277 0
 8273 -8274  8275  960  8278 0

c  1-1 --> 0
c    (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0 ∧ -p_960) -> (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧ -b^{4, 241}_0)
c  in CNF:
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_2
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_1
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_0
c  in DIMACS:
 8273  8274 -8275  960 -8276 0
 8273  8274 -8275  960 -8277 0
 8273  8274 -8275  960 -8278 0

c  0-1 --> -1
c    (-b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧ -p_960) -> ( b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0)
c  in CNF:
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨  b^{4, 241}_2
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_1
c     b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨  b^{4, 241}_0
c  in DIMACS:
 8273  8274  8275  960  8276 0
 8273  8274  8275  960 -8277 0
 8273  8274  8275  960  8278 0

c  -1-1 --> -2
c    ( b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧  b^{4, 240}_0 ∧ -p_960) -> ( b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0)
c  in CNF:
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨  b^{4, 241}_2
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨  b^{4, 241}_1
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨  p_960 ∨ -b^{4, 241}_0
c  in DIMACS:
-8273  8274 -8275  960  8276 0
-8273  8274 -8275  960  8277 0
-8273  8274 -8275  960 -8278 0

c  -2-1 --> break 
c    ( b^{4, 240}_2 ∧  b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨  b^{4, 240}_0 ∨  p_960 ∨ break
c  in DIMACS:
-8273 -8274  8275  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 240}_2 ∧ -b^{4, 240}_1 ∧ -b^{4, 240}_0 ∧ true) 
c  in CNF:
c    -b^{4, 240}_2 ∨  b^{4, 240}_1 ∨  b^{4, 240}_0 ∨ false 
c  in DIMACS:
-8273  8274  8275  0

c  3 does not represent an automaton state.
c    -(-b^{4, 240}_2 ∧  b^{4, 240}_1 ∧  b^{4, 240}_0 ∧ true) 
c  in CNF:
c     b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ false 
c  in DIMACS:
 8273 -8274 -8275  0
c  -3 does not represent an automaton state.
c    -( b^{4, 240}_2 ∧  b^{4, 240}_1 ∧  b^{4, 240}_0 ∧ true) 
c  in CNF:
c    -b^{4, 240}_2 ∨ -b^{4, 240}_1 ∨ -b^{4, 240}_0 ∨ false 
c  in DIMACS:
-8273 -8274 -8275  0

c i = 241
c  -2+1 --> -1
c    ( b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧  p_964) -> ( b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0)
c  in CNF:
c    -b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨  b^{4, 242}_2
c    -b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_1
c    -b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨  b^{4, 242}_0
c  in DIMACS:
-8276 -8277  8278 -964  8279 0
-8276 -8277  8278 -964 -8280 0
-8276 -8277  8278 -964  8281 0

c  -1+1 --> 0
c    ( b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0 ∧  p_964) -> (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧ -b^{4, 242}_0)
c  in CNF:
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_2
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_1
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_0
c  in DIMACS:
-8276  8277 -8278 -964 -8279 0
-8276  8277 -8278 -964 -8280 0
-8276  8277 -8278 -964 -8281 0

c  0+1 --> 1
c    (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧  p_964) -> (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0)
c  in CNF:
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_2
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_1
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨  b^{4, 242}_0
c  in DIMACS:
 8276  8277  8278 -964 -8279 0
 8276  8277  8278 -964 -8280 0
 8276  8277  8278 -964  8281 0

c  1+1 --> 2
c    (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0 ∧  p_964) -> (-b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0)
c  in CNF:
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_2
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨  b^{4, 242}_1
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ -p_964 ∨ -b^{4, 242}_0
c  in DIMACS:
 8276  8277 -8278 -964 -8279 0
 8276  8277 -8278 -964  8280 0
 8276  8277 -8278 -964 -8281 0

c  2+1 --> break 
c    (-b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧  p_964) -> break
c  in CNF:
c     b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ -p_964 ∨ break
c  in DIMACS:
 8276 -8277  8278 -964 1162 0


c  2-1 --> 1
c    (-b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧ -p_964) -> (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0)
c  in CNF:
c     b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_2
c     b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_1
c     b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨  b^{4, 242}_0
c  in DIMACS:
 8276 -8277  8278  964 -8279 0
 8276 -8277  8278  964 -8280 0
 8276 -8277  8278  964  8281 0

c  1-1 --> 0
c    (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0 ∧ -p_964) -> (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧ -b^{4, 242}_0)
c  in CNF:
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_2
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_1
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_0
c  in DIMACS:
 8276  8277 -8278  964 -8279 0
 8276  8277 -8278  964 -8280 0
 8276  8277 -8278  964 -8281 0

c  0-1 --> -1
c    (-b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧ -p_964) -> ( b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0)
c  in CNF:
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨  b^{4, 242}_2
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_1
c     b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨  b^{4, 242}_0
c  in DIMACS:
 8276  8277  8278  964  8279 0
 8276  8277  8278  964 -8280 0
 8276  8277  8278  964  8281 0

c  -1-1 --> -2
c    ( b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧  b^{4, 241}_0 ∧ -p_964) -> ( b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0)
c  in CNF:
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨  b^{4, 242}_2
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨  b^{4, 242}_1
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨  p_964 ∨ -b^{4, 242}_0
c  in DIMACS:
-8276  8277 -8278  964  8279 0
-8276  8277 -8278  964  8280 0
-8276  8277 -8278  964 -8281 0

c  -2-1 --> break 
c    ( b^{4, 241}_2 ∧  b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧ -p_964) -> break
c  in CNF:
c    -b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨  b^{4, 241}_0 ∨  p_964 ∨ break
c  in DIMACS:
-8276 -8277  8278  964 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 241}_2 ∧ -b^{4, 241}_1 ∧ -b^{4, 241}_0 ∧ true) 
c  in CNF:
c    -b^{4, 241}_2 ∨  b^{4, 241}_1 ∨  b^{4, 241}_0 ∨ false 
c  in DIMACS:
-8276  8277  8278  0

c  3 does not represent an automaton state.
c    -(-b^{4, 241}_2 ∧  b^{4, 241}_1 ∧  b^{4, 241}_0 ∧ true) 
c  in CNF:
c     b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ false 
c  in DIMACS:
 8276 -8277 -8278  0
c  -3 does not represent an automaton state.
c    -( b^{4, 241}_2 ∧  b^{4, 241}_1 ∧  b^{4, 241}_0 ∧ true) 
c  in CNF:
c    -b^{4, 241}_2 ∨ -b^{4, 241}_1 ∨ -b^{4, 241}_0 ∨ false 
c  in DIMACS:
-8276 -8277 -8278  0

c i = 242
c  -2+1 --> -1
c    ( b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧  p_968) -> ( b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0)
c  in CNF:
c    -b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨  b^{4, 243}_2
c    -b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_1
c    -b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨  b^{4, 243}_0
c  in DIMACS:
-8279 -8280  8281 -968  8282 0
-8279 -8280  8281 -968 -8283 0
-8279 -8280  8281 -968  8284 0

c  -1+1 --> 0
c    ( b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0 ∧  p_968) -> (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧ -b^{4, 243}_0)
c  in CNF:
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_2
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_1
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_0
c  in DIMACS:
-8279  8280 -8281 -968 -8282 0
-8279  8280 -8281 -968 -8283 0
-8279  8280 -8281 -968 -8284 0

c  0+1 --> 1
c    (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧  p_968) -> (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0)
c  in CNF:
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_2
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_1
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨  b^{4, 243}_0
c  in DIMACS:
 8279  8280  8281 -968 -8282 0
 8279  8280  8281 -968 -8283 0
 8279  8280  8281 -968  8284 0

c  1+1 --> 2
c    (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0 ∧  p_968) -> (-b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0)
c  in CNF:
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_2
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨  b^{4, 243}_1
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ -p_968 ∨ -b^{4, 243}_0
c  in DIMACS:
 8279  8280 -8281 -968 -8282 0
 8279  8280 -8281 -968  8283 0
 8279  8280 -8281 -968 -8284 0

c  2+1 --> break 
c    (-b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧  p_968) -> break
c  in CNF:
c     b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 8279 -8280  8281 -968 1162 0


c  2-1 --> 1
c    (-b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧ -p_968) -> (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0)
c  in CNF:
c     b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_2
c     b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_1
c     b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨  b^{4, 243}_0
c  in DIMACS:
 8279 -8280  8281  968 -8282 0
 8279 -8280  8281  968 -8283 0
 8279 -8280  8281  968  8284 0

c  1-1 --> 0
c    (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0 ∧ -p_968) -> (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧ -b^{4, 243}_0)
c  in CNF:
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_2
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_1
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_0
c  in DIMACS:
 8279  8280 -8281  968 -8282 0
 8279  8280 -8281  968 -8283 0
 8279  8280 -8281  968 -8284 0

c  0-1 --> -1
c    (-b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧ -p_968) -> ( b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0)
c  in CNF:
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨  b^{4, 243}_2
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_1
c     b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨  b^{4, 243}_0
c  in DIMACS:
 8279  8280  8281  968  8282 0
 8279  8280  8281  968 -8283 0
 8279  8280  8281  968  8284 0

c  -1-1 --> -2
c    ( b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧  b^{4, 242}_0 ∧ -p_968) -> ( b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0)
c  in CNF:
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨  b^{4, 243}_2
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨  b^{4, 243}_1
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨  p_968 ∨ -b^{4, 243}_0
c  in DIMACS:
-8279  8280 -8281  968  8282 0
-8279  8280 -8281  968  8283 0
-8279  8280 -8281  968 -8284 0

c  -2-1 --> break 
c    ( b^{4, 242}_2 ∧  b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨  b^{4, 242}_0 ∨  p_968 ∨ break
c  in DIMACS:
-8279 -8280  8281  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 242}_2 ∧ -b^{4, 242}_1 ∧ -b^{4, 242}_0 ∧ true) 
c  in CNF:
c    -b^{4, 242}_2 ∨  b^{4, 242}_1 ∨  b^{4, 242}_0 ∨ false 
c  in DIMACS:
-8279  8280  8281  0

c  3 does not represent an automaton state.
c    -(-b^{4, 242}_2 ∧  b^{4, 242}_1 ∧  b^{4, 242}_0 ∧ true) 
c  in CNF:
c     b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ false 
c  in DIMACS:
 8279 -8280 -8281  0
c  -3 does not represent an automaton state.
c    -( b^{4, 242}_2 ∧  b^{4, 242}_1 ∧  b^{4, 242}_0 ∧ true) 
c  in CNF:
c    -b^{4, 242}_2 ∨ -b^{4, 242}_1 ∨ -b^{4, 242}_0 ∨ false 
c  in DIMACS:
-8279 -8280 -8281  0

c i = 243
c  -2+1 --> -1
c    ( b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧  p_972) -> ( b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0)
c  in CNF:
c    -b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨  b^{4, 244}_2
c    -b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_1
c    -b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨  b^{4, 244}_0
c  in DIMACS:
-8282 -8283  8284 -972  8285 0
-8282 -8283  8284 -972 -8286 0
-8282 -8283  8284 -972  8287 0

c  -1+1 --> 0
c    ( b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0 ∧  p_972) -> (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧ -b^{4, 244}_0)
c  in CNF:
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_2
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_1
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_0
c  in DIMACS:
-8282  8283 -8284 -972 -8285 0
-8282  8283 -8284 -972 -8286 0
-8282  8283 -8284 -972 -8287 0

c  0+1 --> 1
c    (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧  p_972) -> (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0)
c  in CNF:
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_2
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_1
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨  b^{4, 244}_0
c  in DIMACS:
 8282  8283  8284 -972 -8285 0
 8282  8283  8284 -972 -8286 0
 8282  8283  8284 -972  8287 0

c  1+1 --> 2
c    (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0 ∧  p_972) -> (-b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0)
c  in CNF:
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_2
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨  b^{4, 244}_1
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ -p_972 ∨ -b^{4, 244}_0
c  in DIMACS:
 8282  8283 -8284 -972 -8285 0
 8282  8283 -8284 -972  8286 0
 8282  8283 -8284 -972 -8287 0

c  2+1 --> break 
c    (-b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧  p_972) -> break
c  in CNF:
c     b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 8282 -8283  8284 -972 1162 0


c  2-1 --> 1
c    (-b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧ -p_972) -> (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0)
c  in CNF:
c     b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_2
c     b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_1
c     b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨  b^{4, 244}_0
c  in DIMACS:
 8282 -8283  8284  972 -8285 0
 8282 -8283  8284  972 -8286 0
 8282 -8283  8284  972  8287 0

c  1-1 --> 0
c    (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0 ∧ -p_972) -> (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧ -b^{4, 244}_0)
c  in CNF:
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_2
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_1
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_0
c  in DIMACS:
 8282  8283 -8284  972 -8285 0
 8282  8283 -8284  972 -8286 0
 8282  8283 -8284  972 -8287 0

c  0-1 --> -1
c    (-b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧ -p_972) -> ( b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0)
c  in CNF:
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨  b^{4, 244}_2
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_1
c     b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨  b^{4, 244}_0
c  in DIMACS:
 8282  8283  8284  972  8285 0
 8282  8283  8284  972 -8286 0
 8282  8283  8284  972  8287 0

c  -1-1 --> -2
c    ( b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧  b^{4, 243}_0 ∧ -p_972) -> ( b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0)
c  in CNF:
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨  b^{4, 244}_2
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨  b^{4, 244}_1
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨  p_972 ∨ -b^{4, 244}_0
c  in DIMACS:
-8282  8283 -8284  972  8285 0
-8282  8283 -8284  972  8286 0
-8282  8283 -8284  972 -8287 0

c  -2-1 --> break 
c    ( b^{4, 243}_2 ∧  b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨  b^{4, 243}_0 ∨  p_972 ∨ break
c  in DIMACS:
-8282 -8283  8284  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 243}_2 ∧ -b^{4, 243}_1 ∧ -b^{4, 243}_0 ∧ true) 
c  in CNF:
c    -b^{4, 243}_2 ∨  b^{4, 243}_1 ∨  b^{4, 243}_0 ∨ false 
c  in DIMACS:
-8282  8283  8284  0

c  3 does not represent an automaton state.
c    -(-b^{4, 243}_2 ∧  b^{4, 243}_1 ∧  b^{4, 243}_0 ∧ true) 
c  in CNF:
c     b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ false 
c  in DIMACS:
 8282 -8283 -8284  0
c  -3 does not represent an automaton state.
c    -( b^{4, 243}_2 ∧  b^{4, 243}_1 ∧  b^{4, 243}_0 ∧ true) 
c  in CNF:
c    -b^{4, 243}_2 ∨ -b^{4, 243}_1 ∨ -b^{4, 243}_0 ∨ false 
c  in DIMACS:
-8282 -8283 -8284  0

c i = 244
c  -2+1 --> -1
c    ( b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧  p_976) -> ( b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0)
c  in CNF:
c    -b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨  b^{4, 245}_2
c    -b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_1
c    -b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨  b^{4, 245}_0
c  in DIMACS:
-8285 -8286  8287 -976  8288 0
-8285 -8286  8287 -976 -8289 0
-8285 -8286  8287 -976  8290 0

c  -1+1 --> 0
c    ( b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0 ∧  p_976) -> (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧ -b^{4, 245}_0)
c  in CNF:
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_2
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_1
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_0
c  in DIMACS:
-8285  8286 -8287 -976 -8288 0
-8285  8286 -8287 -976 -8289 0
-8285  8286 -8287 -976 -8290 0

c  0+1 --> 1
c    (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧  p_976) -> (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0)
c  in CNF:
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_2
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_1
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨  b^{4, 245}_0
c  in DIMACS:
 8285  8286  8287 -976 -8288 0
 8285  8286  8287 -976 -8289 0
 8285  8286  8287 -976  8290 0

c  1+1 --> 2
c    (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0 ∧  p_976) -> (-b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0)
c  in CNF:
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_2
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨  b^{4, 245}_1
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ -p_976 ∨ -b^{4, 245}_0
c  in DIMACS:
 8285  8286 -8287 -976 -8288 0
 8285  8286 -8287 -976  8289 0
 8285  8286 -8287 -976 -8290 0

c  2+1 --> break 
c    (-b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧  p_976) -> break
c  in CNF:
c     b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 8285 -8286  8287 -976 1162 0


c  2-1 --> 1
c    (-b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧ -p_976) -> (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0)
c  in CNF:
c     b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_2
c     b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_1
c     b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨  b^{4, 245}_0
c  in DIMACS:
 8285 -8286  8287  976 -8288 0
 8285 -8286  8287  976 -8289 0
 8285 -8286  8287  976  8290 0

c  1-1 --> 0
c    (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0 ∧ -p_976) -> (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧ -b^{4, 245}_0)
c  in CNF:
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_2
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_1
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_0
c  in DIMACS:
 8285  8286 -8287  976 -8288 0
 8285  8286 -8287  976 -8289 0
 8285  8286 -8287  976 -8290 0

c  0-1 --> -1
c    (-b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧ -p_976) -> ( b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0)
c  in CNF:
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨  b^{4, 245}_2
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_1
c     b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨  b^{4, 245}_0
c  in DIMACS:
 8285  8286  8287  976  8288 0
 8285  8286  8287  976 -8289 0
 8285  8286  8287  976  8290 0

c  -1-1 --> -2
c    ( b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧  b^{4, 244}_0 ∧ -p_976) -> ( b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0)
c  in CNF:
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨  b^{4, 245}_2
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨  b^{4, 245}_1
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨  p_976 ∨ -b^{4, 245}_0
c  in DIMACS:
-8285  8286 -8287  976  8288 0
-8285  8286 -8287  976  8289 0
-8285  8286 -8287  976 -8290 0

c  -2-1 --> break 
c    ( b^{4, 244}_2 ∧  b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨  b^{4, 244}_0 ∨  p_976 ∨ break
c  in DIMACS:
-8285 -8286  8287  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 244}_2 ∧ -b^{4, 244}_1 ∧ -b^{4, 244}_0 ∧ true) 
c  in CNF:
c    -b^{4, 244}_2 ∨  b^{4, 244}_1 ∨  b^{4, 244}_0 ∨ false 
c  in DIMACS:
-8285  8286  8287  0

c  3 does not represent an automaton state.
c    -(-b^{4, 244}_2 ∧  b^{4, 244}_1 ∧  b^{4, 244}_0 ∧ true) 
c  in CNF:
c     b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ false 
c  in DIMACS:
 8285 -8286 -8287  0
c  -3 does not represent an automaton state.
c    -( b^{4, 244}_2 ∧  b^{4, 244}_1 ∧  b^{4, 244}_0 ∧ true) 
c  in CNF:
c    -b^{4, 244}_2 ∨ -b^{4, 244}_1 ∨ -b^{4, 244}_0 ∨ false 
c  in DIMACS:
-8285 -8286 -8287  0

c i = 245
c  -2+1 --> -1
c    ( b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧  p_980) -> ( b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0)
c  in CNF:
c    -b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨  b^{4, 246}_2
c    -b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_1
c    -b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨  b^{4, 246}_0
c  in DIMACS:
-8288 -8289  8290 -980  8291 0
-8288 -8289  8290 -980 -8292 0
-8288 -8289  8290 -980  8293 0

c  -1+1 --> 0
c    ( b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0 ∧  p_980) -> (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧ -b^{4, 246}_0)
c  in CNF:
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_2
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_1
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_0
c  in DIMACS:
-8288  8289 -8290 -980 -8291 0
-8288  8289 -8290 -980 -8292 0
-8288  8289 -8290 -980 -8293 0

c  0+1 --> 1
c    (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧  p_980) -> (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0)
c  in CNF:
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_2
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_1
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨  b^{4, 246}_0
c  in DIMACS:
 8288  8289  8290 -980 -8291 0
 8288  8289  8290 -980 -8292 0
 8288  8289  8290 -980  8293 0

c  1+1 --> 2
c    (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0 ∧  p_980) -> (-b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0)
c  in CNF:
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_2
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨  b^{4, 246}_1
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ -p_980 ∨ -b^{4, 246}_0
c  in DIMACS:
 8288  8289 -8290 -980 -8291 0
 8288  8289 -8290 -980  8292 0
 8288  8289 -8290 -980 -8293 0

c  2+1 --> break 
c    (-b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧  p_980) -> break
c  in CNF:
c     b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 8288 -8289  8290 -980 1162 0


c  2-1 --> 1
c    (-b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧ -p_980) -> (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0)
c  in CNF:
c     b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_2
c     b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_1
c     b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨  b^{4, 246}_0
c  in DIMACS:
 8288 -8289  8290  980 -8291 0
 8288 -8289  8290  980 -8292 0
 8288 -8289  8290  980  8293 0

c  1-1 --> 0
c    (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0 ∧ -p_980) -> (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧ -b^{4, 246}_0)
c  in CNF:
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_2
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_1
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_0
c  in DIMACS:
 8288  8289 -8290  980 -8291 0
 8288  8289 -8290  980 -8292 0
 8288  8289 -8290  980 -8293 0

c  0-1 --> -1
c    (-b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧ -p_980) -> ( b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0)
c  in CNF:
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨  b^{4, 246}_2
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_1
c     b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨  b^{4, 246}_0
c  in DIMACS:
 8288  8289  8290  980  8291 0
 8288  8289  8290  980 -8292 0
 8288  8289  8290  980  8293 0

c  -1-1 --> -2
c    ( b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧  b^{4, 245}_0 ∧ -p_980) -> ( b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0)
c  in CNF:
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨  b^{4, 246}_2
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨  b^{4, 246}_1
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨  p_980 ∨ -b^{4, 246}_0
c  in DIMACS:
-8288  8289 -8290  980  8291 0
-8288  8289 -8290  980  8292 0
-8288  8289 -8290  980 -8293 0

c  -2-1 --> break 
c    ( b^{4, 245}_2 ∧  b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨  b^{4, 245}_0 ∨  p_980 ∨ break
c  in DIMACS:
-8288 -8289  8290  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 245}_2 ∧ -b^{4, 245}_1 ∧ -b^{4, 245}_0 ∧ true) 
c  in CNF:
c    -b^{4, 245}_2 ∨  b^{4, 245}_1 ∨  b^{4, 245}_0 ∨ false 
c  in DIMACS:
-8288  8289  8290  0

c  3 does not represent an automaton state.
c    -(-b^{4, 245}_2 ∧  b^{4, 245}_1 ∧  b^{4, 245}_0 ∧ true) 
c  in CNF:
c     b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ false 
c  in DIMACS:
 8288 -8289 -8290  0
c  -3 does not represent an automaton state.
c    -( b^{4, 245}_2 ∧  b^{4, 245}_1 ∧  b^{4, 245}_0 ∧ true) 
c  in CNF:
c    -b^{4, 245}_2 ∨ -b^{4, 245}_1 ∨ -b^{4, 245}_0 ∨ false 
c  in DIMACS:
-8288 -8289 -8290  0

c i = 246
c  -2+1 --> -1
c    ( b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧  p_984) -> ( b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0)
c  in CNF:
c    -b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨  b^{4, 247}_2
c    -b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_1
c    -b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨  b^{4, 247}_0
c  in DIMACS:
-8291 -8292  8293 -984  8294 0
-8291 -8292  8293 -984 -8295 0
-8291 -8292  8293 -984  8296 0

c  -1+1 --> 0
c    ( b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0 ∧  p_984) -> (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧ -b^{4, 247}_0)
c  in CNF:
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_2
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_1
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_0
c  in DIMACS:
-8291  8292 -8293 -984 -8294 0
-8291  8292 -8293 -984 -8295 0
-8291  8292 -8293 -984 -8296 0

c  0+1 --> 1
c    (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧  p_984) -> (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0)
c  in CNF:
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_2
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_1
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨  b^{4, 247}_0
c  in DIMACS:
 8291  8292  8293 -984 -8294 0
 8291  8292  8293 -984 -8295 0
 8291  8292  8293 -984  8296 0

c  1+1 --> 2
c    (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0 ∧  p_984) -> (-b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0)
c  in CNF:
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_2
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨  b^{4, 247}_1
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ -p_984 ∨ -b^{4, 247}_0
c  in DIMACS:
 8291  8292 -8293 -984 -8294 0
 8291  8292 -8293 -984  8295 0
 8291  8292 -8293 -984 -8296 0

c  2+1 --> break 
c    (-b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧  p_984) -> break
c  in CNF:
c     b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 8291 -8292  8293 -984 1162 0


c  2-1 --> 1
c    (-b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧ -p_984) -> (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0)
c  in CNF:
c     b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_2
c     b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_1
c     b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨  b^{4, 247}_0
c  in DIMACS:
 8291 -8292  8293  984 -8294 0
 8291 -8292  8293  984 -8295 0
 8291 -8292  8293  984  8296 0

c  1-1 --> 0
c    (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0 ∧ -p_984) -> (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧ -b^{4, 247}_0)
c  in CNF:
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_2
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_1
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_0
c  in DIMACS:
 8291  8292 -8293  984 -8294 0
 8291  8292 -8293  984 -8295 0
 8291  8292 -8293  984 -8296 0

c  0-1 --> -1
c    (-b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧ -p_984) -> ( b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0)
c  in CNF:
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨  b^{4, 247}_2
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_1
c     b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨  b^{4, 247}_0
c  in DIMACS:
 8291  8292  8293  984  8294 0
 8291  8292  8293  984 -8295 0
 8291  8292  8293  984  8296 0

c  -1-1 --> -2
c    ( b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧  b^{4, 246}_0 ∧ -p_984) -> ( b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0)
c  in CNF:
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨  b^{4, 247}_2
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨  b^{4, 247}_1
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨  p_984 ∨ -b^{4, 247}_0
c  in DIMACS:
-8291  8292 -8293  984  8294 0
-8291  8292 -8293  984  8295 0
-8291  8292 -8293  984 -8296 0

c  -2-1 --> break 
c    ( b^{4, 246}_2 ∧  b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨  b^{4, 246}_0 ∨  p_984 ∨ break
c  in DIMACS:
-8291 -8292  8293  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 246}_2 ∧ -b^{4, 246}_1 ∧ -b^{4, 246}_0 ∧ true) 
c  in CNF:
c    -b^{4, 246}_2 ∨  b^{4, 246}_1 ∨  b^{4, 246}_0 ∨ false 
c  in DIMACS:
-8291  8292  8293  0

c  3 does not represent an automaton state.
c    -(-b^{4, 246}_2 ∧  b^{4, 246}_1 ∧  b^{4, 246}_0 ∧ true) 
c  in CNF:
c     b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ false 
c  in DIMACS:
 8291 -8292 -8293  0
c  -3 does not represent an automaton state.
c    -( b^{4, 246}_2 ∧  b^{4, 246}_1 ∧  b^{4, 246}_0 ∧ true) 
c  in CNF:
c    -b^{4, 246}_2 ∨ -b^{4, 246}_1 ∨ -b^{4, 246}_0 ∨ false 
c  in DIMACS:
-8291 -8292 -8293  0

c i = 247
c  -2+1 --> -1
c    ( b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧  p_988) -> ( b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0)
c  in CNF:
c    -b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨  b^{4, 248}_2
c    -b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_1
c    -b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨  b^{4, 248}_0
c  in DIMACS:
-8294 -8295  8296 -988  8297 0
-8294 -8295  8296 -988 -8298 0
-8294 -8295  8296 -988  8299 0

c  -1+1 --> 0
c    ( b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0 ∧  p_988) -> (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧ -b^{4, 248}_0)
c  in CNF:
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_2
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_1
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_0
c  in DIMACS:
-8294  8295 -8296 -988 -8297 0
-8294  8295 -8296 -988 -8298 0
-8294  8295 -8296 -988 -8299 0

c  0+1 --> 1
c    (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧  p_988) -> (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0)
c  in CNF:
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_2
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_1
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨  b^{4, 248}_0
c  in DIMACS:
 8294  8295  8296 -988 -8297 0
 8294  8295  8296 -988 -8298 0
 8294  8295  8296 -988  8299 0

c  1+1 --> 2
c    (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0 ∧  p_988) -> (-b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0)
c  in CNF:
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_2
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨  b^{4, 248}_1
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ -p_988 ∨ -b^{4, 248}_0
c  in DIMACS:
 8294  8295 -8296 -988 -8297 0
 8294  8295 -8296 -988  8298 0
 8294  8295 -8296 -988 -8299 0

c  2+1 --> break 
c    (-b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧  p_988) -> break
c  in CNF:
c     b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 8294 -8295  8296 -988 1162 0


c  2-1 --> 1
c    (-b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧ -p_988) -> (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0)
c  in CNF:
c     b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_2
c     b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_1
c     b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨  b^{4, 248}_0
c  in DIMACS:
 8294 -8295  8296  988 -8297 0
 8294 -8295  8296  988 -8298 0
 8294 -8295  8296  988  8299 0

c  1-1 --> 0
c    (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0 ∧ -p_988) -> (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧ -b^{4, 248}_0)
c  in CNF:
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_2
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_1
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_0
c  in DIMACS:
 8294  8295 -8296  988 -8297 0
 8294  8295 -8296  988 -8298 0
 8294  8295 -8296  988 -8299 0

c  0-1 --> -1
c    (-b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧ -p_988) -> ( b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0)
c  in CNF:
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨  b^{4, 248}_2
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_1
c     b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨  b^{4, 248}_0
c  in DIMACS:
 8294  8295  8296  988  8297 0
 8294  8295  8296  988 -8298 0
 8294  8295  8296  988  8299 0

c  -1-1 --> -2
c    ( b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧  b^{4, 247}_0 ∧ -p_988) -> ( b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0)
c  in CNF:
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨  b^{4, 248}_2
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨  b^{4, 248}_1
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨  p_988 ∨ -b^{4, 248}_0
c  in DIMACS:
-8294  8295 -8296  988  8297 0
-8294  8295 -8296  988  8298 0
-8294  8295 -8296  988 -8299 0

c  -2-1 --> break 
c    ( b^{4, 247}_2 ∧  b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨  b^{4, 247}_0 ∨  p_988 ∨ break
c  in DIMACS:
-8294 -8295  8296  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 247}_2 ∧ -b^{4, 247}_1 ∧ -b^{4, 247}_0 ∧ true) 
c  in CNF:
c    -b^{4, 247}_2 ∨  b^{4, 247}_1 ∨  b^{4, 247}_0 ∨ false 
c  in DIMACS:
-8294  8295  8296  0

c  3 does not represent an automaton state.
c    -(-b^{4, 247}_2 ∧  b^{4, 247}_1 ∧  b^{4, 247}_0 ∧ true) 
c  in CNF:
c     b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ false 
c  in DIMACS:
 8294 -8295 -8296  0
c  -3 does not represent an automaton state.
c    -( b^{4, 247}_2 ∧  b^{4, 247}_1 ∧  b^{4, 247}_0 ∧ true) 
c  in CNF:
c    -b^{4, 247}_2 ∨ -b^{4, 247}_1 ∨ -b^{4, 247}_0 ∨ false 
c  in DIMACS:
-8294 -8295 -8296  0

c i = 248
c  -2+1 --> -1
c    ( b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧  p_992) -> ( b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0)
c  in CNF:
c    -b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨  b^{4, 249}_2
c    -b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_1
c    -b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨  b^{4, 249}_0
c  in DIMACS:
-8297 -8298  8299 -992  8300 0
-8297 -8298  8299 -992 -8301 0
-8297 -8298  8299 -992  8302 0

c  -1+1 --> 0
c    ( b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0 ∧  p_992) -> (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧ -b^{4, 249}_0)
c  in CNF:
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_2
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_1
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_0
c  in DIMACS:
-8297  8298 -8299 -992 -8300 0
-8297  8298 -8299 -992 -8301 0
-8297  8298 -8299 -992 -8302 0

c  0+1 --> 1
c    (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧  p_992) -> (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0)
c  in CNF:
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_2
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_1
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨  b^{4, 249}_0
c  in DIMACS:
 8297  8298  8299 -992 -8300 0
 8297  8298  8299 -992 -8301 0
 8297  8298  8299 -992  8302 0

c  1+1 --> 2
c    (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0 ∧  p_992) -> (-b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0)
c  in CNF:
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_2
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨  b^{4, 249}_1
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ -p_992 ∨ -b^{4, 249}_0
c  in DIMACS:
 8297  8298 -8299 -992 -8300 0
 8297  8298 -8299 -992  8301 0
 8297  8298 -8299 -992 -8302 0

c  2+1 --> break 
c    (-b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧  p_992) -> break
c  in CNF:
c     b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 8297 -8298  8299 -992 1162 0


c  2-1 --> 1
c    (-b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧ -p_992) -> (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0)
c  in CNF:
c     b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_2
c     b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_1
c     b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨  b^{4, 249}_0
c  in DIMACS:
 8297 -8298  8299  992 -8300 0
 8297 -8298  8299  992 -8301 0
 8297 -8298  8299  992  8302 0

c  1-1 --> 0
c    (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0 ∧ -p_992) -> (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧ -b^{4, 249}_0)
c  in CNF:
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_2
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_1
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_0
c  in DIMACS:
 8297  8298 -8299  992 -8300 0
 8297  8298 -8299  992 -8301 0
 8297  8298 -8299  992 -8302 0

c  0-1 --> -1
c    (-b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧ -p_992) -> ( b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0)
c  in CNF:
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨  b^{4, 249}_2
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_1
c     b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨  b^{4, 249}_0
c  in DIMACS:
 8297  8298  8299  992  8300 0
 8297  8298  8299  992 -8301 0
 8297  8298  8299  992  8302 0

c  -1-1 --> -2
c    ( b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧  b^{4, 248}_0 ∧ -p_992) -> ( b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0)
c  in CNF:
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨  b^{4, 249}_2
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨  b^{4, 249}_1
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨  p_992 ∨ -b^{4, 249}_0
c  in DIMACS:
-8297  8298 -8299  992  8300 0
-8297  8298 -8299  992  8301 0
-8297  8298 -8299  992 -8302 0

c  -2-1 --> break 
c    ( b^{4, 248}_2 ∧  b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨  b^{4, 248}_0 ∨  p_992 ∨ break
c  in DIMACS:
-8297 -8298  8299  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 248}_2 ∧ -b^{4, 248}_1 ∧ -b^{4, 248}_0 ∧ true) 
c  in CNF:
c    -b^{4, 248}_2 ∨  b^{4, 248}_1 ∨  b^{4, 248}_0 ∨ false 
c  in DIMACS:
-8297  8298  8299  0

c  3 does not represent an automaton state.
c    -(-b^{4, 248}_2 ∧  b^{4, 248}_1 ∧  b^{4, 248}_0 ∧ true) 
c  in CNF:
c     b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ false 
c  in DIMACS:
 8297 -8298 -8299  0
c  -3 does not represent an automaton state.
c    -( b^{4, 248}_2 ∧  b^{4, 248}_1 ∧  b^{4, 248}_0 ∧ true) 
c  in CNF:
c    -b^{4, 248}_2 ∨ -b^{4, 248}_1 ∨ -b^{4, 248}_0 ∨ false 
c  in DIMACS:
-8297 -8298 -8299  0

c i = 249
c  -2+1 --> -1
c    ( b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧  p_996) -> ( b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0)
c  in CNF:
c    -b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨  b^{4, 250}_2
c    -b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_1
c    -b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨  b^{4, 250}_0
c  in DIMACS:
-8300 -8301  8302 -996  8303 0
-8300 -8301  8302 -996 -8304 0
-8300 -8301  8302 -996  8305 0

c  -1+1 --> 0
c    ( b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0 ∧  p_996) -> (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧ -b^{4, 250}_0)
c  in CNF:
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_2
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_1
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_0
c  in DIMACS:
-8300  8301 -8302 -996 -8303 0
-8300  8301 -8302 -996 -8304 0
-8300  8301 -8302 -996 -8305 0

c  0+1 --> 1
c    (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧  p_996) -> (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0)
c  in CNF:
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_2
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_1
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨  b^{4, 250}_0
c  in DIMACS:
 8300  8301  8302 -996 -8303 0
 8300  8301  8302 -996 -8304 0
 8300  8301  8302 -996  8305 0

c  1+1 --> 2
c    (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0 ∧  p_996) -> (-b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0)
c  in CNF:
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_2
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨  b^{4, 250}_1
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ -p_996 ∨ -b^{4, 250}_0
c  in DIMACS:
 8300  8301 -8302 -996 -8303 0
 8300  8301 -8302 -996  8304 0
 8300  8301 -8302 -996 -8305 0

c  2+1 --> break 
c    (-b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧  p_996) -> break
c  in CNF:
c     b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 8300 -8301  8302 -996 1162 0


c  2-1 --> 1
c    (-b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧ -p_996) -> (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0)
c  in CNF:
c     b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_2
c     b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_1
c     b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨  b^{4, 250}_0
c  in DIMACS:
 8300 -8301  8302  996 -8303 0
 8300 -8301  8302  996 -8304 0
 8300 -8301  8302  996  8305 0

c  1-1 --> 0
c    (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0 ∧ -p_996) -> (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧ -b^{4, 250}_0)
c  in CNF:
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_2
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_1
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_0
c  in DIMACS:
 8300  8301 -8302  996 -8303 0
 8300  8301 -8302  996 -8304 0
 8300  8301 -8302  996 -8305 0

c  0-1 --> -1
c    (-b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧ -p_996) -> ( b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0)
c  in CNF:
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨  b^{4, 250}_2
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_1
c     b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨  b^{4, 250}_0
c  in DIMACS:
 8300  8301  8302  996  8303 0
 8300  8301  8302  996 -8304 0
 8300  8301  8302  996  8305 0

c  -1-1 --> -2
c    ( b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧  b^{4, 249}_0 ∧ -p_996) -> ( b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0)
c  in CNF:
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨  b^{4, 250}_2
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨  b^{4, 250}_1
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨  p_996 ∨ -b^{4, 250}_0
c  in DIMACS:
-8300  8301 -8302  996  8303 0
-8300  8301 -8302  996  8304 0
-8300  8301 -8302  996 -8305 0

c  -2-1 --> break 
c    ( b^{4, 249}_2 ∧  b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨  b^{4, 249}_0 ∨  p_996 ∨ break
c  in DIMACS:
-8300 -8301  8302  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 249}_2 ∧ -b^{4, 249}_1 ∧ -b^{4, 249}_0 ∧ true) 
c  in CNF:
c    -b^{4, 249}_2 ∨  b^{4, 249}_1 ∨  b^{4, 249}_0 ∨ false 
c  in DIMACS:
-8300  8301  8302  0

c  3 does not represent an automaton state.
c    -(-b^{4, 249}_2 ∧  b^{4, 249}_1 ∧  b^{4, 249}_0 ∧ true) 
c  in CNF:
c     b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ false 
c  in DIMACS:
 8300 -8301 -8302  0
c  -3 does not represent an automaton state.
c    -( b^{4, 249}_2 ∧  b^{4, 249}_1 ∧  b^{4, 249}_0 ∧ true) 
c  in CNF:
c    -b^{4, 249}_2 ∨ -b^{4, 249}_1 ∨ -b^{4, 249}_0 ∨ false 
c  in DIMACS:
-8300 -8301 -8302  0

c i = 250
c  -2+1 --> -1
c    ( b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧  p_1000) -> ( b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0)
c  in CNF:
c    -b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨  b^{4, 251}_2
c    -b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_1
c    -b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨  b^{4, 251}_0
c  in DIMACS:
-8303 -8304  8305 -1000  8306 0
-8303 -8304  8305 -1000 -8307 0
-8303 -8304  8305 -1000  8308 0

c  -1+1 --> 0
c    ( b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0 ∧  p_1000) -> (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧ -b^{4, 251}_0)
c  in CNF:
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_2
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_1
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_0
c  in DIMACS:
-8303  8304 -8305 -1000 -8306 0
-8303  8304 -8305 -1000 -8307 0
-8303  8304 -8305 -1000 -8308 0

c  0+1 --> 1
c    (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧  p_1000) -> (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0)
c  in CNF:
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_2
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_1
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨  b^{4, 251}_0
c  in DIMACS:
 8303  8304  8305 -1000 -8306 0
 8303  8304  8305 -1000 -8307 0
 8303  8304  8305 -1000  8308 0

c  1+1 --> 2
c    (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0 ∧  p_1000) -> (-b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0)
c  in CNF:
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_2
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨  b^{4, 251}_1
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ -p_1000 ∨ -b^{4, 251}_0
c  in DIMACS:
 8303  8304 -8305 -1000 -8306 0
 8303  8304 -8305 -1000  8307 0
 8303  8304 -8305 -1000 -8308 0

c  2+1 --> break 
c    (-b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 8303 -8304  8305 -1000 1162 0


c  2-1 --> 1
c    (-b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧ -p_1000) -> (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0)
c  in CNF:
c     b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_2
c     b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_1
c     b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨  b^{4, 251}_0
c  in DIMACS:
 8303 -8304  8305  1000 -8306 0
 8303 -8304  8305  1000 -8307 0
 8303 -8304  8305  1000  8308 0

c  1-1 --> 0
c    (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0 ∧ -p_1000) -> (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧ -b^{4, 251}_0)
c  in CNF:
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_2
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_1
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_0
c  in DIMACS:
 8303  8304 -8305  1000 -8306 0
 8303  8304 -8305  1000 -8307 0
 8303  8304 -8305  1000 -8308 0

c  0-1 --> -1
c    (-b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧ -p_1000) -> ( b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0)
c  in CNF:
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨  b^{4, 251}_2
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_1
c     b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨  b^{4, 251}_0
c  in DIMACS:
 8303  8304  8305  1000  8306 0
 8303  8304  8305  1000 -8307 0
 8303  8304  8305  1000  8308 0

c  -1-1 --> -2
c    ( b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧  b^{4, 250}_0 ∧ -p_1000) -> ( b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0)
c  in CNF:
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨  b^{4, 251}_2
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨  b^{4, 251}_1
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨  p_1000 ∨ -b^{4, 251}_0
c  in DIMACS:
-8303  8304 -8305  1000  8306 0
-8303  8304 -8305  1000  8307 0
-8303  8304 -8305  1000 -8308 0

c  -2-1 --> break 
c    ( b^{4, 250}_2 ∧  b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨  b^{4, 250}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-8303 -8304  8305  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 250}_2 ∧ -b^{4, 250}_1 ∧ -b^{4, 250}_0 ∧ true) 
c  in CNF:
c    -b^{4, 250}_2 ∨  b^{4, 250}_1 ∨  b^{4, 250}_0 ∨ false 
c  in DIMACS:
-8303  8304  8305  0

c  3 does not represent an automaton state.
c    -(-b^{4, 250}_2 ∧  b^{4, 250}_1 ∧  b^{4, 250}_0 ∧ true) 
c  in CNF:
c     b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ false 
c  in DIMACS:
 8303 -8304 -8305  0
c  -3 does not represent an automaton state.
c    -( b^{4, 250}_2 ∧  b^{4, 250}_1 ∧  b^{4, 250}_0 ∧ true) 
c  in CNF:
c    -b^{4, 250}_2 ∨ -b^{4, 250}_1 ∨ -b^{4, 250}_0 ∨ false 
c  in DIMACS:
-8303 -8304 -8305  0

c i = 251
c  -2+1 --> -1
c    ( b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧  p_1004) -> ( b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0)
c  in CNF:
c    -b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨  b^{4, 252}_2
c    -b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_1
c    -b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨  b^{4, 252}_0
c  in DIMACS:
-8306 -8307  8308 -1004  8309 0
-8306 -8307  8308 -1004 -8310 0
-8306 -8307  8308 -1004  8311 0

c  -1+1 --> 0
c    ( b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0 ∧  p_1004) -> (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧ -b^{4, 252}_0)
c  in CNF:
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_2
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_1
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_0
c  in DIMACS:
-8306  8307 -8308 -1004 -8309 0
-8306  8307 -8308 -1004 -8310 0
-8306  8307 -8308 -1004 -8311 0

c  0+1 --> 1
c    (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧  p_1004) -> (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0)
c  in CNF:
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_2
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_1
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨  b^{4, 252}_0
c  in DIMACS:
 8306  8307  8308 -1004 -8309 0
 8306  8307  8308 -1004 -8310 0
 8306  8307  8308 -1004  8311 0

c  1+1 --> 2
c    (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0 ∧  p_1004) -> (-b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0)
c  in CNF:
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_2
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨  b^{4, 252}_1
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ -p_1004 ∨ -b^{4, 252}_0
c  in DIMACS:
 8306  8307 -8308 -1004 -8309 0
 8306  8307 -8308 -1004  8310 0
 8306  8307 -8308 -1004 -8311 0

c  2+1 --> break 
c    (-b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧  p_1004) -> break
c  in CNF:
c     b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ -p_1004 ∨ break
c  in DIMACS:
 8306 -8307  8308 -1004 1162 0


c  2-1 --> 1
c    (-b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧ -p_1004) -> (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0)
c  in CNF:
c     b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_2
c     b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_1
c     b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨  b^{4, 252}_0
c  in DIMACS:
 8306 -8307  8308  1004 -8309 0
 8306 -8307  8308  1004 -8310 0
 8306 -8307  8308  1004  8311 0

c  1-1 --> 0
c    (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0 ∧ -p_1004) -> (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧ -b^{4, 252}_0)
c  in CNF:
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_2
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_1
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_0
c  in DIMACS:
 8306  8307 -8308  1004 -8309 0
 8306  8307 -8308  1004 -8310 0
 8306  8307 -8308  1004 -8311 0

c  0-1 --> -1
c    (-b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧ -p_1004) -> ( b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0)
c  in CNF:
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨  b^{4, 252}_2
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_1
c     b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨  b^{4, 252}_0
c  in DIMACS:
 8306  8307  8308  1004  8309 0
 8306  8307  8308  1004 -8310 0
 8306  8307  8308  1004  8311 0

c  -1-1 --> -2
c    ( b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧  b^{4, 251}_0 ∧ -p_1004) -> ( b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0)
c  in CNF:
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨  b^{4, 252}_2
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨  b^{4, 252}_1
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨  p_1004 ∨ -b^{4, 252}_0
c  in DIMACS:
-8306  8307 -8308  1004  8309 0
-8306  8307 -8308  1004  8310 0
-8306  8307 -8308  1004 -8311 0

c  -2-1 --> break 
c    ( b^{4, 251}_2 ∧  b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧ -p_1004) -> break
c  in CNF:
c    -b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨  b^{4, 251}_0 ∨  p_1004 ∨ break
c  in DIMACS:
-8306 -8307  8308  1004 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 251}_2 ∧ -b^{4, 251}_1 ∧ -b^{4, 251}_0 ∧ true) 
c  in CNF:
c    -b^{4, 251}_2 ∨  b^{4, 251}_1 ∨  b^{4, 251}_0 ∨ false 
c  in DIMACS:
-8306  8307  8308  0

c  3 does not represent an automaton state.
c    -(-b^{4, 251}_2 ∧  b^{4, 251}_1 ∧  b^{4, 251}_0 ∧ true) 
c  in CNF:
c     b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ false 
c  in DIMACS:
 8306 -8307 -8308  0
c  -3 does not represent an automaton state.
c    -( b^{4, 251}_2 ∧  b^{4, 251}_1 ∧  b^{4, 251}_0 ∧ true) 
c  in CNF:
c    -b^{4, 251}_2 ∨ -b^{4, 251}_1 ∨ -b^{4, 251}_0 ∨ false 
c  in DIMACS:
-8306 -8307 -8308  0

c i = 252
c  -2+1 --> -1
c    ( b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧  p_1008) -> ( b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0)
c  in CNF:
c    -b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨  b^{4, 253}_2
c    -b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_1
c    -b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨  b^{4, 253}_0
c  in DIMACS:
-8309 -8310  8311 -1008  8312 0
-8309 -8310  8311 -1008 -8313 0
-8309 -8310  8311 -1008  8314 0

c  -1+1 --> 0
c    ( b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0 ∧  p_1008) -> (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧ -b^{4, 253}_0)
c  in CNF:
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_2
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_1
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_0
c  in DIMACS:
-8309  8310 -8311 -1008 -8312 0
-8309  8310 -8311 -1008 -8313 0
-8309  8310 -8311 -1008 -8314 0

c  0+1 --> 1
c    (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧  p_1008) -> (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0)
c  in CNF:
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_2
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_1
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨  b^{4, 253}_0
c  in DIMACS:
 8309  8310  8311 -1008 -8312 0
 8309  8310  8311 -1008 -8313 0
 8309  8310  8311 -1008  8314 0

c  1+1 --> 2
c    (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0 ∧  p_1008) -> (-b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0)
c  in CNF:
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_2
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨  b^{4, 253}_1
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ -p_1008 ∨ -b^{4, 253}_0
c  in DIMACS:
 8309  8310 -8311 -1008 -8312 0
 8309  8310 -8311 -1008  8313 0
 8309  8310 -8311 -1008 -8314 0

c  2+1 --> break 
c    (-b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 8309 -8310  8311 -1008 1162 0


c  2-1 --> 1
c    (-b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧ -p_1008) -> (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0)
c  in CNF:
c     b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_2
c     b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_1
c     b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨  b^{4, 253}_0
c  in DIMACS:
 8309 -8310  8311  1008 -8312 0
 8309 -8310  8311  1008 -8313 0
 8309 -8310  8311  1008  8314 0

c  1-1 --> 0
c    (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0 ∧ -p_1008) -> (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧ -b^{4, 253}_0)
c  in CNF:
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_2
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_1
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_0
c  in DIMACS:
 8309  8310 -8311  1008 -8312 0
 8309  8310 -8311  1008 -8313 0
 8309  8310 -8311  1008 -8314 0

c  0-1 --> -1
c    (-b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧ -p_1008) -> ( b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0)
c  in CNF:
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨  b^{4, 253}_2
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_1
c     b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨  b^{4, 253}_0
c  in DIMACS:
 8309  8310  8311  1008  8312 0
 8309  8310  8311  1008 -8313 0
 8309  8310  8311  1008  8314 0

c  -1-1 --> -2
c    ( b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧  b^{4, 252}_0 ∧ -p_1008) -> ( b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0)
c  in CNF:
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨  b^{4, 253}_2
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨  b^{4, 253}_1
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨  p_1008 ∨ -b^{4, 253}_0
c  in DIMACS:
-8309  8310 -8311  1008  8312 0
-8309  8310 -8311  1008  8313 0
-8309  8310 -8311  1008 -8314 0

c  -2-1 --> break 
c    ( b^{4, 252}_2 ∧  b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨  b^{4, 252}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-8309 -8310  8311  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 252}_2 ∧ -b^{4, 252}_1 ∧ -b^{4, 252}_0 ∧ true) 
c  in CNF:
c    -b^{4, 252}_2 ∨  b^{4, 252}_1 ∨  b^{4, 252}_0 ∨ false 
c  in DIMACS:
-8309  8310  8311  0

c  3 does not represent an automaton state.
c    -(-b^{4, 252}_2 ∧  b^{4, 252}_1 ∧  b^{4, 252}_0 ∧ true) 
c  in CNF:
c     b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ false 
c  in DIMACS:
 8309 -8310 -8311  0
c  -3 does not represent an automaton state.
c    -( b^{4, 252}_2 ∧  b^{4, 252}_1 ∧  b^{4, 252}_0 ∧ true) 
c  in CNF:
c    -b^{4, 252}_2 ∨ -b^{4, 252}_1 ∨ -b^{4, 252}_0 ∨ false 
c  in DIMACS:
-8309 -8310 -8311  0

c i = 253
c  -2+1 --> -1
c    ( b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧  p_1012) -> ( b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0)
c  in CNF:
c    -b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨  b^{4, 254}_2
c    -b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_1
c    -b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨  b^{4, 254}_0
c  in DIMACS:
-8312 -8313  8314 -1012  8315 0
-8312 -8313  8314 -1012 -8316 0
-8312 -8313  8314 -1012  8317 0

c  -1+1 --> 0
c    ( b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0 ∧  p_1012) -> (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧ -b^{4, 254}_0)
c  in CNF:
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_2
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_1
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_0
c  in DIMACS:
-8312  8313 -8314 -1012 -8315 0
-8312  8313 -8314 -1012 -8316 0
-8312  8313 -8314 -1012 -8317 0

c  0+1 --> 1
c    (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧  p_1012) -> (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0)
c  in CNF:
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_2
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_1
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨  b^{4, 254}_0
c  in DIMACS:
 8312  8313  8314 -1012 -8315 0
 8312  8313  8314 -1012 -8316 0
 8312  8313  8314 -1012  8317 0

c  1+1 --> 2
c    (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0 ∧  p_1012) -> (-b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0)
c  in CNF:
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_2
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨  b^{4, 254}_1
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ -p_1012 ∨ -b^{4, 254}_0
c  in DIMACS:
 8312  8313 -8314 -1012 -8315 0
 8312  8313 -8314 -1012  8316 0
 8312  8313 -8314 -1012 -8317 0

c  2+1 --> break 
c    (-b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 8312 -8313  8314 -1012 1162 0


c  2-1 --> 1
c    (-b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧ -p_1012) -> (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0)
c  in CNF:
c     b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_2
c     b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_1
c     b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨  b^{4, 254}_0
c  in DIMACS:
 8312 -8313  8314  1012 -8315 0
 8312 -8313  8314  1012 -8316 0
 8312 -8313  8314  1012  8317 0

c  1-1 --> 0
c    (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0 ∧ -p_1012) -> (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧ -b^{4, 254}_0)
c  in CNF:
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_2
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_1
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_0
c  in DIMACS:
 8312  8313 -8314  1012 -8315 0
 8312  8313 -8314  1012 -8316 0
 8312  8313 -8314  1012 -8317 0

c  0-1 --> -1
c    (-b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧ -p_1012) -> ( b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0)
c  in CNF:
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨  b^{4, 254}_2
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_1
c     b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨  b^{4, 254}_0
c  in DIMACS:
 8312  8313  8314  1012  8315 0
 8312  8313  8314  1012 -8316 0
 8312  8313  8314  1012  8317 0

c  -1-1 --> -2
c    ( b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧  b^{4, 253}_0 ∧ -p_1012) -> ( b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0)
c  in CNF:
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨  b^{4, 254}_2
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨  b^{4, 254}_1
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨  p_1012 ∨ -b^{4, 254}_0
c  in DIMACS:
-8312  8313 -8314  1012  8315 0
-8312  8313 -8314  1012  8316 0
-8312  8313 -8314  1012 -8317 0

c  -2-1 --> break 
c    ( b^{4, 253}_2 ∧  b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨  b^{4, 253}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-8312 -8313  8314  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 253}_2 ∧ -b^{4, 253}_1 ∧ -b^{4, 253}_0 ∧ true) 
c  in CNF:
c    -b^{4, 253}_2 ∨  b^{4, 253}_1 ∨  b^{4, 253}_0 ∨ false 
c  in DIMACS:
-8312  8313  8314  0

c  3 does not represent an automaton state.
c    -(-b^{4, 253}_2 ∧  b^{4, 253}_1 ∧  b^{4, 253}_0 ∧ true) 
c  in CNF:
c     b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ false 
c  in DIMACS:
 8312 -8313 -8314  0
c  -3 does not represent an automaton state.
c    -( b^{4, 253}_2 ∧  b^{4, 253}_1 ∧  b^{4, 253}_0 ∧ true) 
c  in CNF:
c    -b^{4, 253}_2 ∨ -b^{4, 253}_1 ∨ -b^{4, 253}_0 ∨ false 
c  in DIMACS:
-8312 -8313 -8314  0

c i = 254
c  -2+1 --> -1
c    ( b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧  p_1016) -> ( b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0)
c  in CNF:
c    -b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨  b^{4, 255}_2
c    -b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_1
c    -b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨  b^{4, 255}_0
c  in DIMACS:
-8315 -8316  8317 -1016  8318 0
-8315 -8316  8317 -1016 -8319 0
-8315 -8316  8317 -1016  8320 0

c  -1+1 --> 0
c    ( b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0 ∧  p_1016) -> (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧ -b^{4, 255}_0)
c  in CNF:
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_2
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_1
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_0
c  in DIMACS:
-8315  8316 -8317 -1016 -8318 0
-8315  8316 -8317 -1016 -8319 0
-8315  8316 -8317 -1016 -8320 0

c  0+1 --> 1
c    (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧  p_1016) -> (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0)
c  in CNF:
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_2
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_1
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨  b^{4, 255}_0
c  in DIMACS:
 8315  8316  8317 -1016 -8318 0
 8315  8316  8317 -1016 -8319 0
 8315  8316  8317 -1016  8320 0

c  1+1 --> 2
c    (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0 ∧  p_1016) -> (-b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0)
c  in CNF:
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_2
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨  b^{4, 255}_1
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ -p_1016 ∨ -b^{4, 255}_0
c  in DIMACS:
 8315  8316 -8317 -1016 -8318 0
 8315  8316 -8317 -1016  8319 0
 8315  8316 -8317 -1016 -8320 0

c  2+1 --> break 
c    (-b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 8315 -8316  8317 -1016 1162 0


c  2-1 --> 1
c    (-b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧ -p_1016) -> (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0)
c  in CNF:
c     b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_2
c     b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_1
c     b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨  b^{4, 255}_0
c  in DIMACS:
 8315 -8316  8317  1016 -8318 0
 8315 -8316  8317  1016 -8319 0
 8315 -8316  8317  1016  8320 0

c  1-1 --> 0
c    (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0 ∧ -p_1016) -> (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧ -b^{4, 255}_0)
c  in CNF:
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_2
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_1
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_0
c  in DIMACS:
 8315  8316 -8317  1016 -8318 0
 8315  8316 -8317  1016 -8319 0
 8315  8316 -8317  1016 -8320 0

c  0-1 --> -1
c    (-b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧ -p_1016) -> ( b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0)
c  in CNF:
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨  b^{4, 255}_2
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_1
c     b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨  b^{4, 255}_0
c  in DIMACS:
 8315  8316  8317  1016  8318 0
 8315  8316  8317  1016 -8319 0
 8315  8316  8317  1016  8320 0

c  -1-1 --> -2
c    ( b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧  b^{4, 254}_0 ∧ -p_1016) -> ( b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0)
c  in CNF:
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨  b^{4, 255}_2
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨  b^{4, 255}_1
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨  p_1016 ∨ -b^{4, 255}_0
c  in DIMACS:
-8315  8316 -8317  1016  8318 0
-8315  8316 -8317  1016  8319 0
-8315  8316 -8317  1016 -8320 0

c  -2-1 --> break 
c    ( b^{4, 254}_2 ∧  b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨  b^{4, 254}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-8315 -8316  8317  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 254}_2 ∧ -b^{4, 254}_1 ∧ -b^{4, 254}_0 ∧ true) 
c  in CNF:
c    -b^{4, 254}_2 ∨  b^{4, 254}_1 ∨  b^{4, 254}_0 ∨ false 
c  in DIMACS:
-8315  8316  8317  0

c  3 does not represent an automaton state.
c    -(-b^{4, 254}_2 ∧  b^{4, 254}_1 ∧  b^{4, 254}_0 ∧ true) 
c  in CNF:
c     b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ false 
c  in DIMACS:
 8315 -8316 -8317  0
c  -3 does not represent an automaton state.
c    -( b^{4, 254}_2 ∧  b^{4, 254}_1 ∧  b^{4, 254}_0 ∧ true) 
c  in CNF:
c    -b^{4, 254}_2 ∨ -b^{4, 254}_1 ∨ -b^{4, 254}_0 ∨ false 
c  in DIMACS:
-8315 -8316 -8317  0

c i = 255
c  -2+1 --> -1
c    ( b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧  p_1020) -> ( b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0)
c  in CNF:
c    -b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨  b^{4, 256}_2
c    -b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_1
c    -b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨  b^{4, 256}_0
c  in DIMACS:
-8318 -8319  8320 -1020  8321 0
-8318 -8319  8320 -1020 -8322 0
-8318 -8319  8320 -1020  8323 0

c  -1+1 --> 0
c    ( b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0 ∧  p_1020) -> (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧ -b^{4, 256}_0)
c  in CNF:
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_2
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_1
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_0
c  in DIMACS:
-8318  8319 -8320 -1020 -8321 0
-8318  8319 -8320 -1020 -8322 0
-8318  8319 -8320 -1020 -8323 0

c  0+1 --> 1
c    (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧  p_1020) -> (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0)
c  in CNF:
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_2
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_1
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨  b^{4, 256}_0
c  in DIMACS:
 8318  8319  8320 -1020 -8321 0
 8318  8319  8320 -1020 -8322 0
 8318  8319  8320 -1020  8323 0

c  1+1 --> 2
c    (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0 ∧  p_1020) -> (-b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0)
c  in CNF:
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_2
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨  b^{4, 256}_1
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ -p_1020 ∨ -b^{4, 256}_0
c  in DIMACS:
 8318  8319 -8320 -1020 -8321 0
 8318  8319 -8320 -1020  8322 0
 8318  8319 -8320 -1020 -8323 0

c  2+1 --> break 
c    (-b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 8318 -8319  8320 -1020 1162 0


c  2-1 --> 1
c    (-b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧ -p_1020) -> (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0)
c  in CNF:
c     b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_2
c     b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_1
c     b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨  b^{4, 256}_0
c  in DIMACS:
 8318 -8319  8320  1020 -8321 0
 8318 -8319  8320  1020 -8322 0
 8318 -8319  8320  1020  8323 0

c  1-1 --> 0
c    (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0 ∧ -p_1020) -> (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧ -b^{4, 256}_0)
c  in CNF:
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_2
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_1
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_0
c  in DIMACS:
 8318  8319 -8320  1020 -8321 0
 8318  8319 -8320  1020 -8322 0
 8318  8319 -8320  1020 -8323 0

c  0-1 --> -1
c    (-b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧ -p_1020) -> ( b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0)
c  in CNF:
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨  b^{4, 256}_2
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_1
c     b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨  b^{4, 256}_0
c  in DIMACS:
 8318  8319  8320  1020  8321 0
 8318  8319  8320  1020 -8322 0
 8318  8319  8320  1020  8323 0

c  -1-1 --> -2
c    ( b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧  b^{4, 255}_0 ∧ -p_1020) -> ( b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0)
c  in CNF:
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨  b^{4, 256}_2
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨  b^{4, 256}_1
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨  p_1020 ∨ -b^{4, 256}_0
c  in DIMACS:
-8318  8319 -8320  1020  8321 0
-8318  8319 -8320  1020  8322 0
-8318  8319 -8320  1020 -8323 0

c  -2-1 --> break 
c    ( b^{4, 255}_2 ∧  b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨  b^{4, 255}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-8318 -8319  8320  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 255}_2 ∧ -b^{4, 255}_1 ∧ -b^{4, 255}_0 ∧ true) 
c  in CNF:
c    -b^{4, 255}_2 ∨  b^{4, 255}_1 ∨  b^{4, 255}_0 ∨ false 
c  in DIMACS:
-8318  8319  8320  0

c  3 does not represent an automaton state.
c    -(-b^{4, 255}_2 ∧  b^{4, 255}_1 ∧  b^{4, 255}_0 ∧ true) 
c  in CNF:
c     b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ false 
c  in DIMACS:
 8318 -8319 -8320  0
c  -3 does not represent an automaton state.
c    -( b^{4, 255}_2 ∧  b^{4, 255}_1 ∧  b^{4, 255}_0 ∧ true) 
c  in CNF:
c    -b^{4, 255}_2 ∨ -b^{4, 255}_1 ∨ -b^{4, 255}_0 ∨ false 
c  in DIMACS:
-8318 -8319 -8320  0

c i = 256
c  -2+1 --> -1
c    ( b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧  p_1024) -> ( b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0)
c  in CNF:
c    -b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨  b^{4, 257}_2
c    -b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_1
c    -b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨  b^{4, 257}_0
c  in DIMACS:
-8321 -8322  8323 -1024  8324 0
-8321 -8322  8323 -1024 -8325 0
-8321 -8322  8323 -1024  8326 0

c  -1+1 --> 0
c    ( b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0 ∧  p_1024) -> (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧ -b^{4, 257}_0)
c  in CNF:
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_2
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_1
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_0
c  in DIMACS:
-8321  8322 -8323 -1024 -8324 0
-8321  8322 -8323 -1024 -8325 0
-8321  8322 -8323 -1024 -8326 0

c  0+1 --> 1
c    (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧  p_1024) -> (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0)
c  in CNF:
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_2
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_1
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨  b^{4, 257}_0
c  in DIMACS:
 8321  8322  8323 -1024 -8324 0
 8321  8322  8323 -1024 -8325 0
 8321  8322  8323 -1024  8326 0

c  1+1 --> 2
c    (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0 ∧  p_1024) -> (-b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0)
c  in CNF:
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_2
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨  b^{4, 257}_1
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ -p_1024 ∨ -b^{4, 257}_0
c  in DIMACS:
 8321  8322 -8323 -1024 -8324 0
 8321  8322 -8323 -1024  8325 0
 8321  8322 -8323 -1024 -8326 0

c  2+1 --> break 
c    (-b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 8321 -8322  8323 -1024 1162 0


c  2-1 --> 1
c    (-b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧ -p_1024) -> (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0)
c  in CNF:
c     b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_2
c     b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_1
c     b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨  b^{4, 257}_0
c  in DIMACS:
 8321 -8322  8323  1024 -8324 0
 8321 -8322  8323  1024 -8325 0
 8321 -8322  8323  1024  8326 0

c  1-1 --> 0
c    (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0 ∧ -p_1024) -> (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧ -b^{4, 257}_0)
c  in CNF:
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_2
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_1
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_0
c  in DIMACS:
 8321  8322 -8323  1024 -8324 0
 8321  8322 -8323  1024 -8325 0
 8321  8322 -8323  1024 -8326 0

c  0-1 --> -1
c    (-b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧ -p_1024) -> ( b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0)
c  in CNF:
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨  b^{4, 257}_2
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_1
c     b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨  b^{4, 257}_0
c  in DIMACS:
 8321  8322  8323  1024  8324 0
 8321  8322  8323  1024 -8325 0
 8321  8322  8323  1024  8326 0

c  -1-1 --> -2
c    ( b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧  b^{4, 256}_0 ∧ -p_1024) -> ( b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0)
c  in CNF:
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨  b^{4, 257}_2
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨  b^{4, 257}_1
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨  p_1024 ∨ -b^{4, 257}_0
c  in DIMACS:
-8321  8322 -8323  1024  8324 0
-8321  8322 -8323  1024  8325 0
-8321  8322 -8323  1024 -8326 0

c  -2-1 --> break 
c    ( b^{4, 256}_2 ∧  b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨  b^{4, 256}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-8321 -8322  8323  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 256}_2 ∧ -b^{4, 256}_1 ∧ -b^{4, 256}_0 ∧ true) 
c  in CNF:
c    -b^{4, 256}_2 ∨  b^{4, 256}_1 ∨  b^{4, 256}_0 ∨ false 
c  in DIMACS:
-8321  8322  8323  0

c  3 does not represent an automaton state.
c    -(-b^{4, 256}_2 ∧  b^{4, 256}_1 ∧  b^{4, 256}_0 ∧ true) 
c  in CNF:
c     b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ false 
c  in DIMACS:
 8321 -8322 -8323  0
c  -3 does not represent an automaton state.
c    -( b^{4, 256}_2 ∧  b^{4, 256}_1 ∧  b^{4, 256}_0 ∧ true) 
c  in CNF:
c    -b^{4, 256}_2 ∨ -b^{4, 256}_1 ∨ -b^{4, 256}_0 ∨ false 
c  in DIMACS:
-8321 -8322 -8323  0

c i = 257
c  -2+1 --> -1
c    ( b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧  p_1028) -> ( b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0)
c  in CNF:
c    -b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨  b^{4, 258}_2
c    -b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_1
c    -b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨  b^{4, 258}_0
c  in DIMACS:
-8324 -8325  8326 -1028  8327 0
-8324 -8325  8326 -1028 -8328 0
-8324 -8325  8326 -1028  8329 0

c  -1+1 --> 0
c    ( b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0 ∧  p_1028) -> (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧ -b^{4, 258}_0)
c  in CNF:
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_2
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_1
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_0
c  in DIMACS:
-8324  8325 -8326 -1028 -8327 0
-8324  8325 -8326 -1028 -8328 0
-8324  8325 -8326 -1028 -8329 0

c  0+1 --> 1
c    (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧  p_1028) -> (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0)
c  in CNF:
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_2
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_1
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨  b^{4, 258}_0
c  in DIMACS:
 8324  8325  8326 -1028 -8327 0
 8324  8325  8326 -1028 -8328 0
 8324  8325  8326 -1028  8329 0

c  1+1 --> 2
c    (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0 ∧  p_1028) -> (-b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0)
c  in CNF:
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_2
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨  b^{4, 258}_1
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ -p_1028 ∨ -b^{4, 258}_0
c  in DIMACS:
 8324  8325 -8326 -1028 -8327 0
 8324  8325 -8326 -1028  8328 0
 8324  8325 -8326 -1028 -8329 0

c  2+1 --> break 
c    (-b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧  p_1028) -> break
c  in CNF:
c     b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ -p_1028 ∨ break
c  in DIMACS:
 8324 -8325  8326 -1028 1162 0


c  2-1 --> 1
c    (-b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧ -p_1028) -> (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0)
c  in CNF:
c     b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_2
c     b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_1
c     b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨  b^{4, 258}_0
c  in DIMACS:
 8324 -8325  8326  1028 -8327 0
 8324 -8325  8326  1028 -8328 0
 8324 -8325  8326  1028  8329 0

c  1-1 --> 0
c    (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0 ∧ -p_1028) -> (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧ -b^{4, 258}_0)
c  in CNF:
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_2
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_1
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_0
c  in DIMACS:
 8324  8325 -8326  1028 -8327 0
 8324  8325 -8326  1028 -8328 0
 8324  8325 -8326  1028 -8329 0

c  0-1 --> -1
c    (-b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧ -p_1028) -> ( b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0)
c  in CNF:
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨  b^{4, 258}_2
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_1
c     b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨  b^{4, 258}_0
c  in DIMACS:
 8324  8325  8326  1028  8327 0
 8324  8325  8326  1028 -8328 0
 8324  8325  8326  1028  8329 0

c  -1-1 --> -2
c    ( b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧  b^{4, 257}_0 ∧ -p_1028) -> ( b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0)
c  in CNF:
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨  b^{4, 258}_2
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨  b^{4, 258}_1
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨  p_1028 ∨ -b^{4, 258}_0
c  in DIMACS:
-8324  8325 -8326  1028  8327 0
-8324  8325 -8326  1028  8328 0
-8324  8325 -8326  1028 -8329 0

c  -2-1 --> break 
c    ( b^{4, 257}_2 ∧  b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧ -p_1028) -> break
c  in CNF:
c    -b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨  b^{4, 257}_0 ∨  p_1028 ∨ break
c  in DIMACS:
-8324 -8325  8326  1028 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 257}_2 ∧ -b^{4, 257}_1 ∧ -b^{4, 257}_0 ∧ true) 
c  in CNF:
c    -b^{4, 257}_2 ∨  b^{4, 257}_1 ∨  b^{4, 257}_0 ∨ false 
c  in DIMACS:
-8324  8325  8326  0

c  3 does not represent an automaton state.
c    -(-b^{4, 257}_2 ∧  b^{4, 257}_1 ∧  b^{4, 257}_0 ∧ true) 
c  in CNF:
c     b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ false 
c  in DIMACS:
 8324 -8325 -8326  0
c  -3 does not represent an automaton state.
c    -( b^{4, 257}_2 ∧  b^{4, 257}_1 ∧  b^{4, 257}_0 ∧ true) 
c  in CNF:
c    -b^{4, 257}_2 ∨ -b^{4, 257}_1 ∨ -b^{4, 257}_0 ∨ false 
c  in DIMACS:
-8324 -8325 -8326  0

c i = 258
c  -2+1 --> -1
c    ( b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧  p_1032) -> ( b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0)
c  in CNF:
c    -b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨  b^{4, 259}_2
c    -b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_1
c    -b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨  b^{4, 259}_0
c  in DIMACS:
-8327 -8328  8329 -1032  8330 0
-8327 -8328  8329 -1032 -8331 0
-8327 -8328  8329 -1032  8332 0

c  -1+1 --> 0
c    ( b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0 ∧  p_1032) -> (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧ -b^{4, 259}_0)
c  in CNF:
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_2
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_1
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_0
c  in DIMACS:
-8327  8328 -8329 -1032 -8330 0
-8327  8328 -8329 -1032 -8331 0
-8327  8328 -8329 -1032 -8332 0

c  0+1 --> 1
c    (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧  p_1032) -> (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0)
c  in CNF:
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_2
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_1
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨  b^{4, 259}_0
c  in DIMACS:
 8327  8328  8329 -1032 -8330 0
 8327  8328  8329 -1032 -8331 0
 8327  8328  8329 -1032  8332 0

c  1+1 --> 2
c    (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0 ∧  p_1032) -> (-b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0)
c  in CNF:
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_2
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨  b^{4, 259}_1
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ -p_1032 ∨ -b^{4, 259}_0
c  in DIMACS:
 8327  8328 -8329 -1032 -8330 0
 8327  8328 -8329 -1032  8331 0
 8327  8328 -8329 -1032 -8332 0

c  2+1 --> break 
c    (-b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 8327 -8328  8329 -1032 1162 0


c  2-1 --> 1
c    (-b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧ -p_1032) -> (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0)
c  in CNF:
c     b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_2
c     b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_1
c     b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨  b^{4, 259}_0
c  in DIMACS:
 8327 -8328  8329  1032 -8330 0
 8327 -8328  8329  1032 -8331 0
 8327 -8328  8329  1032  8332 0

c  1-1 --> 0
c    (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0 ∧ -p_1032) -> (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧ -b^{4, 259}_0)
c  in CNF:
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_2
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_1
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_0
c  in DIMACS:
 8327  8328 -8329  1032 -8330 0
 8327  8328 -8329  1032 -8331 0
 8327  8328 -8329  1032 -8332 0

c  0-1 --> -1
c    (-b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧ -p_1032) -> ( b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0)
c  in CNF:
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨  b^{4, 259}_2
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_1
c     b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨  b^{4, 259}_0
c  in DIMACS:
 8327  8328  8329  1032  8330 0
 8327  8328  8329  1032 -8331 0
 8327  8328  8329  1032  8332 0

c  -1-1 --> -2
c    ( b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧  b^{4, 258}_0 ∧ -p_1032) -> ( b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0)
c  in CNF:
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨  b^{4, 259}_2
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨  b^{4, 259}_1
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨  p_1032 ∨ -b^{4, 259}_0
c  in DIMACS:
-8327  8328 -8329  1032  8330 0
-8327  8328 -8329  1032  8331 0
-8327  8328 -8329  1032 -8332 0

c  -2-1 --> break 
c    ( b^{4, 258}_2 ∧  b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨  b^{4, 258}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-8327 -8328  8329  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 258}_2 ∧ -b^{4, 258}_1 ∧ -b^{4, 258}_0 ∧ true) 
c  in CNF:
c    -b^{4, 258}_2 ∨  b^{4, 258}_1 ∨  b^{4, 258}_0 ∨ false 
c  in DIMACS:
-8327  8328  8329  0

c  3 does not represent an automaton state.
c    -(-b^{4, 258}_2 ∧  b^{4, 258}_1 ∧  b^{4, 258}_0 ∧ true) 
c  in CNF:
c     b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ false 
c  in DIMACS:
 8327 -8328 -8329  0
c  -3 does not represent an automaton state.
c    -( b^{4, 258}_2 ∧  b^{4, 258}_1 ∧  b^{4, 258}_0 ∧ true) 
c  in CNF:
c    -b^{4, 258}_2 ∨ -b^{4, 258}_1 ∨ -b^{4, 258}_0 ∨ false 
c  in DIMACS:
-8327 -8328 -8329  0

c i = 259
c  -2+1 --> -1
c    ( b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧  p_1036) -> ( b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0)
c  in CNF:
c    -b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨  b^{4, 260}_2
c    -b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_1
c    -b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨  b^{4, 260}_0
c  in DIMACS:
-8330 -8331  8332 -1036  8333 0
-8330 -8331  8332 -1036 -8334 0
-8330 -8331  8332 -1036  8335 0

c  -1+1 --> 0
c    ( b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0 ∧  p_1036) -> (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧ -b^{4, 260}_0)
c  in CNF:
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_2
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_1
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_0
c  in DIMACS:
-8330  8331 -8332 -1036 -8333 0
-8330  8331 -8332 -1036 -8334 0
-8330  8331 -8332 -1036 -8335 0

c  0+1 --> 1
c    (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧  p_1036) -> (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0)
c  in CNF:
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_2
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_1
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨  b^{4, 260}_0
c  in DIMACS:
 8330  8331  8332 -1036 -8333 0
 8330  8331  8332 -1036 -8334 0
 8330  8331  8332 -1036  8335 0

c  1+1 --> 2
c    (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0 ∧  p_1036) -> (-b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0)
c  in CNF:
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_2
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨  b^{4, 260}_1
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ -p_1036 ∨ -b^{4, 260}_0
c  in DIMACS:
 8330  8331 -8332 -1036 -8333 0
 8330  8331 -8332 -1036  8334 0
 8330  8331 -8332 -1036 -8335 0

c  2+1 --> break 
c    (-b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 8330 -8331  8332 -1036 1162 0


c  2-1 --> 1
c    (-b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧ -p_1036) -> (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0)
c  in CNF:
c     b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_2
c     b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_1
c     b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨  b^{4, 260}_0
c  in DIMACS:
 8330 -8331  8332  1036 -8333 0
 8330 -8331  8332  1036 -8334 0
 8330 -8331  8332  1036  8335 0

c  1-1 --> 0
c    (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0 ∧ -p_1036) -> (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧ -b^{4, 260}_0)
c  in CNF:
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_2
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_1
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_0
c  in DIMACS:
 8330  8331 -8332  1036 -8333 0
 8330  8331 -8332  1036 -8334 0
 8330  8331 -8332  1036 -8335 0

c  0-1 --> -1
c    (-b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧ -p_1036) -> ( b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0)
c  in CNF:
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨  b^{4, 260}_2
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_1
c     b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨  b^{4, 260}_0
c  in DIMACS:
 8330  8331  8332  1036  8333 0
 8330  8331  8332  1036 -8334 0
 8330  8331  8332  1036  8335 0

c  -1-1 --> -2
c    ( b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧  b^{4, 259}_0 ∧ -p_1036) -> ( b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0)
c  in CNF:
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨  b^{4, 260}_2
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨  b^{4, 260}_1
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨  p_1036 ∨ -b^{4, 260}_0
c  in DIMACS:
-8330  8331 -8332  1036  8333 0
-8330  8331 -8332  1036  8334 0
-8330  8331 -8332  1036 -8335 0

c  -2-1 --> break 
c    ( b^{4, 259}_2 ∧  b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨  b^{4, 259}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-8330 -8331  8332  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 259}_2 ∧ -b^{4, 259}_1 ∧ -b^{4, 259}_0 ∧ true) 
c  in CNF:
c    -b^{4, 259}_2 ∨  b^{4, 259}_1 ∨  b^{4, 259}_0 ∨ false 
c  in DIMACS:
-8330  8331  8332  0

c  3 does not represent an automaton state.
c    -(-b^{4, 259}_2 ∧  b^{4, 259}_1 ∧  b^{4, 259}_0 ∧ true) 
c  in CNF:
c     b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ false 
c  in DIMACS:
 8330 -8331 -8332  0
c  -3 does not represent an automaton state.
c    -( b^{4, 259}_2 ∧  b^{4, 259}_1 ∧  b^{4, 259}_0 ∧ true) 
c  in CNF:
c    -b^{4, 259}_2 ∨ -b^{4, 259}_1 ∨ -b^{4, 259}_0 ∨ false 
c  in DIMACS:
-8330 -8331 -8332  0

c i = 260
c  -2+1 --> -1
c    ( b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧  p_1040) -> ( b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0)
c  in CNF:
c    -b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨  b^{4, 261}_2
c    -b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_1
c    -b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨  b^{4, 261}_0
c  in DIMACS:
-8333 -8334  8335 -1040  8336 0
-8333 -8334  8335 -1040 -8337 0
-8333 -8334  8335 -1040  8338 0

c  -1+1 --> 0
c    ( b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0 ∧  p_1040) -> (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧ -b^{4, 261}_0)
c  in CNF:
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_2
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_1
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_0
c  in DIMACS:
-8333  8334 -8335 -1040 -8336 0
-8333  8334 -8335 -1040 -8337 0
-8333  8334 -8335 -1040 -8338 0

c  0+1 --> 1
c    (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧  p_1040) -> (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0)
c  in CNF:
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_2
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_1
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨  b^{4, 261}_0
c  in DIMACS:
 8333  8334  8335 -1040 -8336 0
 8333  8334  8335 -1040 -8337 0
 8333  8334  8335 -1040  8338 0

c  1+1 --> 2
c    (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0 ∧  p_1040) -> (-b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0)
c  in CNF:
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_2
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨  b^{4, 261}_1
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ -p_1040 ∨ -b^{4, 261}_0
c  in DIMACS:
 8333  8334 -8335 -1040 -8336 0
 8333  8334 -8335 -1040  8337 0
 8333  8334 -8335 -1040 -8338 0

c  2+1 --> break 
c    (-b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 8333 -8334  8335 -1040 1162 0


c  2-1 --> 1
c    (-b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧ -p_1040) -> (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0)
c  in CNF:
c     b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_2
c     b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_1
c     b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨  b^{4, 261}_0
c  in DIMACS:
 8333 -8334  8335  1040 -8336 0
 8333 -8334  8335  1040 -8337 0
 8333 -8334  8335  1040  8338 0

c  1-1 --> 0
c    (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0 ∧ -p_1040) -> (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧ -b^{4, 261}_0)
c  in CNF:
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_2
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_1
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_0
c  in DIMACS:
 8333  8334 -8335  1040 -8336 0
 8333  8334 -8335  1040 -8337 0
 8333  8334 -8335  1040 -8338 0

c  0-1 --> -1
c    (-b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧ -p_1040) -> ( b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0)
c  in CNF:
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨  b^{4, 261}_2
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_1
c     b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨  b^{4, 261}_0
c  in DIMACS:
 8333  8334  8335  1040  8336 0
 8333  8334  8335  1040 -8337 0
 8333  8334  8335  1040  8338 0

c  -1-1 --> -2
c    ( b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧  b^{4, 260}_0 ∧ -p_1040) -> ( b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0)
c  in CNF:
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨  b^{4, 261}_2
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨  b^{4, 261}_1
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨  p_1040 ∨ -b^{4, 261}_0
c  in DIMACS:
-8333  8334 -8335  1040  8336 0
-8333  8334 -8335  1040  8337 0
-8333  8334 -8335  1040 -8338 0

c  -2-1 --> break 
c    ( b^{4, 260}_2 ∧  b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨  b^{4, 260}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-8333 -8334  8335  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 260}_2 ∧ -b^{4, 260}_1 ∧ -b^{4, 260}_0 ∧ true) 
c  in CNF:
c    -b^{4, 260}_2 ∨  b^{4, 260}_1 ∨  b^{4, 260}_0 ∨ false 
c  in DIMACS:
-8333  8334  8335  0

c  3 does not represent an automaton state.
c    -(-b^{4, 260}_2 ∧  b^{4, 260}_1 ∧  b^{4, 260}_0 ∧ true) 
c  in CNF:
c     b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ false 
c  in DIMACS:
 8333 -8334 -8335  0
c  -3 does not represent an automaton state.
c    -( b^{4, 260}_2 ∧  b^{4, 260}_1 ∧  b^{4, 260}_0 ∧ true) 
c  in CNF:
c    -b^{4, 260}_2 ∨ -b^{4, 260}_1 ∨ -b^{4, 260}_0 ∨ false 
c  in DIMACS:
-8333 -8334 -8335  0

c i = 261
c  -2+1 --> -1
c    ( b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧  p_1044) -> ( b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0)
c  in CNF:
c    -b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨  b^{4, 262}_2
c    -b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_1
c    -b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨  b^{4, 262}_0
c  in DIMACS:
-8336 -8337  8338 -1044  8339 0
-8336 -8337  8338 -1044 -8340 0
-8336 -8337  8338 -1044  8341 0

c  -1+1 --> 0
c    ( b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0 ∧  p_1044) -> (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧ -b^{4, 262}_0)
c  in CNF:
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_2
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_1
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_0
c  in DIMACS:
-8336  8337 -8338 -1044 -8339 0
-8336  8337 -8338 -1044 -8340 0
-8336  8337 -8338 -1044 -8341 0

c  0+1 --> 1
c    (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧  p_1044) -> (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0)
c  in CNF:
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_2
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_1
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨  b^{4, 262}_0
c  in DIMACS:
 8336  8337  8338 -1044 -8339 0
 8336  8337  8338 -1044 -8340 0
 8336  8337  8338 -1044  8341 0

c  1+1 --> 2
c    (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0 ∧  p_1044) -> (-b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0)
c  in CNF:
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_2
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨  b^{4, 262}_1
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ -p_1044 ∨ -b^{4, 262}_0
c  in DIMACS:
 8336  8337 -8338 -1044 -8339 0
 8336  8337 -8338 -1044  8340 0
 8336  8337 -8338 -1044 -8341 0

c  2+1 --> break 
c    (-b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 8336 -8337  8338 -1044 1162 0


c  2-1 --> 1
c    (-b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧ -p_1044) -> (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0)
c  in CNF:
c     b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_2
c     b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_1
c     b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨  b^{4, 262}_0
c  in DIMACS:
 8336 -8337  8338  1044 -8339 0
 8336 -8337  8338  1044 -8340 0
 8336 -8337  8338  1044  8341 0

c  1-1 --> 0
c    (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0 ∧ -p_1044) -> (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧ -b^{4, 262}_0)
c  in CNF:
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_2
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_1
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_0
c  in DIMACS:
 8336  8337 -8338  1044 -8339 0
 8336  8337 -8338  1044 -8340 0
 8336  8337 -8338  1044 -8341 0

c  0-1 --> -1
c    (-b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧ -p_1044) -> ( b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0)
c  in CNF:
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨  b^{4, 262}_2
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_1
c     b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨  b^{4, 262}_0
c  in DIMACS:
 8336  8337  8338  1044  8339 0
 8336  8337  8338  1044 -8340 0
 8336  8337  8338  1044  8341 0

c  -1-1 --> -2
c    ( b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧  b^{4, 261}_0 ∧ -p_1044) -> ( b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0)
c  in CNF:
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨  b^{4, 262}_2
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨  b^{4, 262}_1
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨  p_1044 ∨ -b^{4, 262}_0
c  in DIMACS:
-8336  8337 -8338  1044  8339 0
-8336  8337 -8338  1044  8340 0
-8336  8337 -8338  1044 -8341 0

c  -2-1 --> break 
c    ( b^{4, 261}_2 ∧  b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨  b^{4, 261}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-8336 -8337  8338  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 261}_2 ∧ -b^{4, 261}_1 ∧ -b^{4, 261}_0 ∧ true) 
c  in CNF:
c    -b^{4, 261}_2 ∨  b^{4, 261}_1 ∨  b^{4, 261}_0 ∨ false 
c  in DIMACS:
-8336  8337  8338  0

c  3 does not represent an automaton state.
c    -(-b^{4, 261}_2 ∧  b^{4, 261}_1 ∧  b^{4, 261}_0 ∧ true) 
c  in CNF:
c     b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ false 
c  in DIMACS:
 8336 -8337 -8338  0
c  -3 does not represent an automaton state.
c    -( b^{4, 261}_2 ∧  b^{4, 261}_1 ∧  b^{4, 261}_0 ∧ true) 
c  in CNF:
c    -b^{4, 261}_2 ∨ -b^{4, 261}_1 ∨ -b^{4, 261}_0 ∨ false 
c  in DIMACS:
-8336 -8337 -8338  0

c i = 262
c  -2+1 --> -1
c    ( b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧  p_1048) -> ( b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0)
c  in CNF:
c    -b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨  b^{4, 263}_2
c    -b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_1
c    -b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨  b^{4, 263}_0
c  in DIMACS:
-8339 -8340  8341 -1048  8342 0
-8339 -8340  8341 -1048 -8343 0
-8339 -8340  8341 -1048  8344 0

c  -1+1 --> 0
c    ( b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0 ∧  p_1048) -> (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧ -b^{4, 263}_0)
c  in CNF:
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_2
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_1
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_0
c  in DIMACS:
-8339  8340 -8341 -1048 -8342 0
-8339  8340 -8341 -1048 -8343 0
-8339  8340 -8341 -1048 -8344 0

c  0+1 --> 1
c    (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧  p_1048) -> (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0)
c  in CNF:
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_2
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_1
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨  b^{4, 263}_0
c  in DIMACS:
 8339  8340  8341 -1048 -8342 0
 8339  8340  8341 -1048 -8343 0
 8339  8340  8341 -1048  8344 0

c  1+1 --> 2
c    (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0 ∧  p_1048) -> (-b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0)
c  in CNF:
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_2
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨  b^{4, 263}_1
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ -p_1048 ∨ -b^{4, 263}_0
c  in DIMACS:
 8339  8340 -8341 -1048 -8342 0
 8339  8340 -8341 -1048  8343 0
 8339  8340 -8341 -1048 -8344 0

c  2+1 --> break 
c    (-b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 8339 -8340  8341 -1048 1162 0


c  2-1 --> 1
c    (-b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧ -p_1048) -> (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0)
c  in CNF:
c     b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_2
c     b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_1
c     b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨  b^{4, 263}_0
c  in DIMACS:
 8339 -8340  8341  1048 -8342 0
 8339 -8340  8341  1048 -8343 0
 8339 -8340  8341  1048  8344 0

c  1-1 --> 0
c    (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0 ∧ -p_1048) -> (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧ -b^{4, 263}_0)
c  in CNF:
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_2
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_1
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_0
c  in DIMACS:
 8339  8340 -8341  1048 -8342 0
 8339  8340 -8341  1048 -8343 0
 8339  8340 -8341  1048 -8344 0

c  0-1 --> -1
c    (-b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧ -p_1048) -> ( b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0)
c  in CNF:
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨  b^{4, 263}_2
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_1
c     b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨  b^{4, 263}_0
c  in DIMACS:
 8339  8340  8341  1048  8342 0
 8339  8340  8341  1048 -8343 0
 8339  8340  8341  1048  8344 0

c  -1-1 --> -2
c    ( b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧  b^{4, 262}_0 ∧ -p_1048) -> ( b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0)
c  in CNF:
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨  b^{4, 263}_2
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨  b^{4, 263}_1
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨  p_1048 ∨ -b^{4, 263}_0
c  in DIMACS:
-8339  8340 -8341  1048  8342 0
-8339  8340 -8341  1048  8343 0
-8339  8340 -8341  1048 -8344 0

c  -2-1 --> break 
c    ( b^{4, 262}_2 ∧  b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨  b^{4, 262}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-8339 -8340  8341  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 262}_2 ∧ -b^{4, 262}_1 ∧ -b^{4, 262}_0 ∧ true) 
c  in CNF:
c    -b^{4, 262}_2 ∨  b^{4, 262}_1 ∨  b^{4, 262}_0 ∨ false 
c  in DIMACS:
-8339  8340  8341  0

c  3 does not represent an automaton state.
c    -(-b^{4, 262}_2 ∧  b^{4, 262}_1 ∧  b^{4, 262}_0 ∧ true) 
c  in CNF:
c     b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ false 
c  in DIMACS:
 8339 -8340 -8341  0
c  -3 does not represent an automaton state.
c    -( b^{4, 262}_2 ∧  b^{4, 262}_1 ∧  b^{4, 262}_0 ∧ true) 
c  in CNF:
c    -b^{4, 262}_2 ∨ -b^{4, 262}_1 ∨ -b^{4, 262}_0 ∨ false 
c  in DIMACS:
-8339 -8340 -8341  0

c i = 263
c  -2+1 --> -1
c    ( b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧  p_1052) -> ( b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0)
c  in CNF:
c    -b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨  b^{4, 264}_2
c    -b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_1
c    -b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨  b^{4, 264}_0
c  in DIMACS:
-8342 -8343  8344 -1052  8345 0
-8342 -8343  8344 -1052 -8346 0
-8342 -8343  8344 -1052  8347 0

c  -1+1 --> 0
c    ( b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0 ∧  p_1052) -> (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧ -b^{4, 264}_0)
c  in CNF:
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_2
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_1
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_0
c  in DIMACS:
-8342  8343 -8344 -1052 -8345 0
-8342  8343 -8344 -1052 -8346 0
-8342  8343 -8344 -1052 -8347 0

c  0+1 --> 1
c    (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧  p_1052) -> (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0)
c  in CNF:
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_2
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_1
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨  b^{4, 264}_0
c  in DIMACS:
 8342  8343  8344 -1052 -8345 0
 8342  8343  8344 -1052 -8346 0
 8342  8343  8344 -1052  8347 0

c  1+1 --> 2
c    (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0 ∧  p_1052) -> (-b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0)
c  in CNF:
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_2
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨  b^{4, 264}_1
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ -p_1052 ∨ -b^{4, 264}_0
c  in DIMACS:
 8342  8343 -8344 -1052 -8345 0
 8342  8343 -8344 -1052  8346 0
 8342  8343 -8344 -1052 -8347 0

c  2+1 --> break 
c    (-b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧  p_1052) -> break
c  in CNF:
c     b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ -p_1052 ∨ break
c  in DIMACS:
 8342 -8343  8344 -1052 1162 0


c  2-1 --> 1
c    (-b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧ -p_1052) -> (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0)
c  in CNF:
c     b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_2
c     b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_1
c     b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨  b^{4, 264}_0
c  in DIMACS:
 8342 -8343  8344  1052 -8345 0
 8342 -8343  8344  1052 -8346 0
 8342 -8343  8344  1052  8347 0

c  1-1 --> 0
c    (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0 ∧ -p_1052) -> (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧ -b^{4, 264}_0)
c  in CNF:
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_2
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_1
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_0
c  in DIMACS:
 8342  8343 -8344  1052 -8345 0
 8342  8343 -8344  1052 -8346 0
 8342  8343 -8344  1052 -8347 0

c  0-1 --> -1
c    (-b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧ -p_1052) -> ( b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0)
c  in CNF:
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨  b^{4, 264}_2
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_1
c     b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨  b^{4, 264}_0
c  in DIMACS:
 8342  8343  8344  1052  8345 0
 8342  8343  8344  1052 -8346 0
 8342  8343  8344  1052  8347 0

c  -1-1 --> -2
c    ( b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧  b^{4, 263}_0 ∧ -p_1052) -> ( b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0)
c  in CNF:
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨  b^{4, 264}_2
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨  b^{4, 264}_1
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨  p_1052 ∨ -b^{4, 264}_0
c  in DIMACS:
-8342  8343 -8344  1052  8345 0
-8342  8343 -8344  1052  8346 0
-8342  8343 -8344  1052 -8347 0

c  -2-1 --> break 
c    ( b^{4, 263}_2 ∧  b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧ -p_1052) -> break
c  in CNF:
c    -b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨  b^{4, 263}_0 ∨  p_1052 ∨ break
c  in DIMACS:
-8342 -8343  8344  1052 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 263}_2 ∧ -b^{4, 263}_1 ∧ -b^{4, 263}_0 ∧ true) 
c  in CNF:
c    -b^{4, 263}_2 ∨  b^{4, 263}_1 ∨  b^{4, 263}_0 ∨ false 
c  in DIMACS:
-8342  8343  8344  0

c  3 does not represent an automaton state.
c    -(-b^{4, 263}_2 ∧  b^{4, 263}_1 ∧  b^{4, 263}_0 ∧ true) 
c  in CNF:
c     b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ false 
c  in DIMACS:
 8342 -8343 -8344  0
c  -3 does not represent an automaton state.
c    -( b^{4, 263}_2 ∧  b^{4, 263}_1 ∧  b^{4, 263}_0 ∧ true) 
c  in CNF:
c    -b^{4, 263}_2 ∨ -b^{4, 263}_1 ∨ -b^{4, 263}_0 ∨ false 
c  in DIMACS:
-8342 -8343 -8344  0

c i = 264
c  -2+1 --> -1
c    ( b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧  p_1056) -> ( b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0)
c  in CNF:
c    -b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨  b^{4, 265}_2
c    -b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_1
c    -b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨  b^{4, 265}_0
c  in DIMACS:
-8345 -8346  8347 -1056  8348 0
-8345 -8346  8347 -1056 -8349 0
-8345 -8346  8347 -1056  8350 0

c  -1+1 --> 0
c    ( b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0 ∧  p_1056) -> (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧ -b^{4, 265}_0)
c  in CNF:
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_2
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_1
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_0
c  in DIMACS:
-8345  8346 -8347 -1056 -8348 0
-8345  8346 -8347 -1056 -8349 0
-8345  8346 -8347 -1056 -8350 0

c  0+1 --> 1
c    (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧  p_1056) -> (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0)
c  in CNF:
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_2
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_1
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨  b^{4, 265}_0
c  in DIMACS:
 8345  8346  8347 -1056 -8348 0
 8345  8346  8347 -1056 -8349 0
 8345  8346  8347 -1056  8350 0

c  1+1 --> 2
c    (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0 ∧  p_1056) -> (-b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0)
c  in CNF:
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_2
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨  b^{4, 265}_1
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ -p_1056 ∨ -b^{4, 265}_0
c  in DIMACS:
 8345  8346 -8347 -1056 -8348 0
 8345  8346 -8347 -1056  8349 0
 8345  8346 -8347 -1056 -8350 0

c  2+1 --> break 
c    (-b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 8345 -8346  8347 -1056 1162 0


c  2-1 --> 1
c    (-b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧ -p_1056) -> (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0)
c  in CNF:
c     b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_2
c     b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_1
c     b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨  b^{4, 265}_0
c  in DIMACS:
 8345 -8346  8347  1056 -8348 0
 8345 -8346  8347  1056 -8349 0
 8345 -8346  8347  1056  8350 0

c  1-1 --> 0
c    (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0 ∧ -p_1056) -> (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧ -b^{4, 265}_0)
c  in CNF:
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_2
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_1
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_0
c  in DIMACS:
 8345  8346 -8347  1056 -8348 0
 8345  8346 -8347  1056 -8349 0
 8345  8346 -8347  1056 -8350 0

c  0-1 --> -1
c    (-b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧ -p_1056) -> ( b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0)
c  in CNF:
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨  b^{4, 265}_2
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_1
c     b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨  b^{4, 265}_0
c  in DIMACS:
 8345  8346  8347  1056  8348 0
 8345  8346  8347  1056 -8349 0
 8345  8346  8347  1056  8350 0

c  -1-1 --> -2
c    ( b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧  b^{4, 264}_0 ∧ -p_1056) -> ( b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0)
c  in CNF:
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨  b^{4, 265}_2
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨  b^{4, 265}_1
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨  p_1056 ∨ -b^{4, 265}_0
c  in DIMACS:
-8345  8346 -8347  1056  8348 0
-8345  8346 -8347  1056  8349 0
-8345  8346 -8347  1056 -8350 0

c  -2-1 --> break 
c    ( b^{4, 264}_2 ∧  b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨  b^{4, 264}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-8345 -8346  8347  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 264}_2 ∧ -b^{4, 264}_1 ∧ -b^{4, 264}_0 ∧ true) 
c  in CNF:
c    -b^{4, 264}_2 ∨  b^{4, 264}_1 ∨  b^{4, 264}_0 ∨ false 
c  in DIMACS:
-8345  8346  8347  0

c  3 does not represent an automaton state.
c    -(-b^{4, 264}_2 ∧  b^{4, 264}_1 ∧  b^{4, 264}_0 ∧ true) 
c  in CNF:
c     b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ false 
c  in DIMACS:
 8345 -8346 -8347  0
c  -3 does not represent an automaton state.
c    -( b^{4, 264}_2 ∧  b^{4, 264}_1 ∧  b^{4, 264}_0 ∧ true) 
c  in CNF:
c    -b^{4, 264}_2 ∨ -b^{4, 264}_1 ∨ -b^{4, 264}_0 ∨ false 
c  in DIMACS:
-8345 -8346 -8347  0

c i = 265
c  -2+1 --> -1
c    ( b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧  p_1060) -> ( b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0)
c  in CNF:
c    -b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨  b^{4, 266}_2
c    -b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_1
c    -b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨  b^{4, 266}_0
c  in DIMACS:
-8348 -8349  8350 -1060  8351 0
-8348 -8349  8350 -1060 -8352 0
-8348 -8349  8350 -1060  8353 0

c  -1+1 --> 0
c    ( b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0 ∧  p_1060) -> (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧ -b^{4, 266}_0)
c  in CNF:
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_2
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_1
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_0
c  in DIMACS:
-8348  8349 -8350 -1060 -8351 0
-8348  8349 -8350 -1060 -8352 0
-8348  8349 -8350 -1060 -8353 0

c  0+1 --> 1
c    (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧  p_1060) -> (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0)
c  in CNF:
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_2
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_1
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨  b^{4, 266}_0
c  in DIMACS:
 8348  8349  8350 -1060 -8351 0
 8348  8349  8350 -1060 -8352 0
 8348  8349  8350 -1060  8353 0

c  1+1 --> 2
c    (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0 ∧  p_1060) -> (-b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0)
c  in CNF:
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_2
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨  b^{4, 266}_1
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ -p_1060 ∨ -b^{4, 266}_0
c  in DIMACS:
 8348  8349 -8350 -1060 -8351 0
 8348  8349 -8350 -1060  8352 0
 8348  8349 -8350 -1060 -8353 0

c  2+1 --> break 
c    (-b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 8348 -8349  8350 -1060 1162 0


c  2-1 --> 1
c    (-b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧ -p_1060) -> (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0)
c  in CNF:
c     b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_2
c     b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_1
c     b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨  b^{4, 266}_0
c  in DIMACS:
 8348 -8349  8350  1060 -8351 0
 8348 -8349  8350  1060 -8352 0
 8348 -8349  8350  1060  8353 0

c  1-1 --> 0
c    (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0 ∧ -p_1060) -> (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧ -b^{4, 266}_0)
c  in CNF:
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_2
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_1
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_0
c  in DIMACS:
 8348  8349 -8350  1060 -8351 0
 8348  8349 -8350  1060 -8352 0
 8348  8349 -8350  1060 -8353 0

c  0-1 --> -1
c    (-b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧ -p_1060) -> ( b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0)
c  in CNF:
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨  b^{4, 266}_2
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_1
c     b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨  b^{4, 266}_0
c  in DIMACS:
 8348  8349  8350  1060  8351 0
 8348  8349  8350  1060 -8352 0
 8348  8349  8350  1060  8353 0

c  -1-1 --> -2
c    ( b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧  b^{4, 265}_0 ∧ -p_1060) -> ( b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0)
c  in CNF:
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨  b^{4, 266}_2
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨  b^{4, 266}_1
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨  p_1060 ∨ -b^{4, 266}_0
c  in DIMACS:
-8348  8349 -8350  1060  8351 0
-8348  8349 -8350  1060  8352 0
-8348  8349 -8350  1060 -8353 0

c  -2-1 --> break 
c    ( b^{4, 265}_2 ∧  b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨  b^{4, 265}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-8348 -8349  8350  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 265}_2 ∧ -b^{4, 265}_1 ∧ -b^{4, 265}_0 ∧ true) 
c  in CNF:
c    -b^{4, 265}_2 ∨  b^{4, 265}_1 ∨  b^{4, 265}_0 ∨ false 
c  in DIMACS:
-8348  8349  8350  0

c  3 does not represent an automaton state.
c    -(-b^{4, 265}_2 ∧  b^{4, 265}_1 ∧  b^{4, 265}_0 ∧ true) 
c  in CNF:
c     b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ false 
c  in DIMACS:
 8348 -8349 -8350  0
c  -3 does not represent an automaton state.
c    -( b^{4, 265}_2 ∧  b^{4, 265}_1 ∧  b^{4, 265}_0 ∧ true) 
c  in CNF:
c    -b^{4, 265}_2 ∨ -b^{4, 265}_1 ∨ -b^{4, 265}_0 ∨ false 
c  in DIMACS:
-8348 -8349 -8350  0

c i = 266
c  -2+1 --> -1
c    ( b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧  p_1064) -> ( b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0)
c  in CNF:
c    -b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨  b^{4, 267}_2
c    -b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_1
c    -b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨  b^{4, 267}_0
c  in DIMACS:
-8351 -8352  8353 -1064  8354 0
-8351 -8352  8353 -1064 -8355 0
-8351 -8352  8353 -1064  8356 0

c  -1+1 --> 0
c    ( b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0 ∧  p_1064) -> (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧ -b^{4, 267}_0)
c  in CNF:
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_2
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_1
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_0
c  in DIMACS:
-8351  8352 -8353 -1064 -8354 0
-8351  8352 -8353 -1064 -8355 0
-8351  8352 -8353 -1064 -8356 0

c  0+1 --> 1
c    (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧  p_1064) -> (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0)
c  in CNF:
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_2
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_1
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨  b^{4, 267}_0
c  in DIMACS:
 8351  8352  8353 -1064 -8354 0
 8351  8352  8353 -1064 -8355 0
 8351  8352  8353 -1064  8356 0

c  1+1 --> 2
c    (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0 ∧  p_1064) -> (-b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0)
c  in CNF:
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_2
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨  b^{4, 267}_1
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ -p_1064 ∨ -b^{4, 267}_0
c  in DIMACS:
 8351  8352 -8353 -1064 -8354 0
 8351  8352 -8353 -1064  8355 0
 8351  8352 -8353 -1064 -8356 0

c  2+1 --> break 
c    (-b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 8351 -8352  8353 -1064 1162 0


c  2-1 --> 1
c    (-b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧ -p_1064) -> (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0)
c  in CNF:
c     b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_2
c     b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_1
c     b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨  b^{4, 267}_0
c  in DIMACS:
 8351 -8352  8353  1064 -8354 0
 8351 -8352  8353  1064 -8355 0
 8351 -8352  8353  1064  8356 0

c  1-1 --> 0
c    (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0 ∧ -p_1064) -> (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧ -b^{4, 267}_0)
c  in CNF:
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_2
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_1
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_0
c  in DIMACS:
 8351  8352 -8353  1064 -8354 0
 8351  8352 -8353  1064 -8355 0
 8351  8352 -8353  1064 -8356 0

c  0-1 --> -1
c    (-b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧ -p_1064) -> ( b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0)
c  in CNF:
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨  b^{4, 267}_2
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_1
c     b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨  b^{4, 267}_0
c  in DIMACS:
 8351  8352  8353  1064  8354 0
 8351  8352  8353  1064 -8355 0
 8351  8352  8353  1064  8356 0

c  -1-1 --> -2
c    ( b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧  b^{4, 266}_0 ∧ -p_1064) -> ( b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0)
c  in CNF:
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨  b^{4, 267}_2
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨  b^{4, 267}_1
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨  p_1064 ∨ -b^{4, 267}_0
c  in DIMACS:
-8351  8352 -8353  1064  8354 0
-8351  8352 -8353  1064  8355 0
-8351  8352 -8353  1064 -8356 0

c  -2-1 --> break 
c    ( b^{4, 266}_2 ∧  b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨  b^{4, 266}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-8351 -8352  8353  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 266}_2 ∧ -b^{4, 266}_1 ∧ -b^{4, 266}_0 ∧ true) 
c  in CNF:
c    -b^{4, 266}_2 ∨  b^{4, 266}_1 ∨  b^{4, 266}_0 ∨ false 
c  in DIMACS:
-8351  8352  8353  0

c  3 does not represent an automaton state.
c    -(-b^{4, 266}_2 ∧  b^{4, 266}_1 ∧  b^{4, 266}_0 ∧ true) 
c  in CNF:
c     b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ false 
c  in DIMACS:
 8351 -8352 -8353  0
c  -3 does not represent an automaton state.
c    -( b^{4, 266}_2 ∧  b^{4, 266}_1 ∧  b^{4, 266}_0 ∧ true) 
c  in CNF:
c    -b^{4, 266}_2 ∨ -b^{4, 266}_1 ∨ -b^{4, 266}_0 ∨ false 
c  in DIMACS:
-8351 -8352 -8353  0

c i = 267
c  -2+1 --> -1
c    ( b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧  p_1068) -> ( b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0)
c  in CNF:
c    -b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨  b^{4, 268}_2
c    -b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_1
c    -b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨  b^{4, 268}_0
c  in DIMACS:
-8354 -8355  8356 -1068  8357 0
-8354 -8355  8356 -1068 -8358 0
-8354 -8355  8356 -1068  8359 0

c  -1+1 --> 0
c    ( b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0 ∧  p_1068) -> (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧ -b^{4, 268}_0)
c  in CNF:
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_2
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_1
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_0
c  in DIMACS:
-8354  8355 -8356 -1068 -8357 0
-8354  8355 -8356 -1068 -8358 0
-8354  8355 -8356 -1068 -8359 0

c  0+1 --> 1
c    (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧  p_1068) -> (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0)
c  in CNF:
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_2
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_1
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨  b^{4, 268}_0
c  in DIMACS:
 8354  8355  8356 -1068 -8357 0
 8354  8355  8356 -1068 -8358 0
 8354  8355  8356 -1068  8359 0

c  1+1 --> 2
c    (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0 ∧  p_1068) -> (-b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0)
c  in CNF:
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_2
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨  b^{4, 268}_1
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ -p_1068 ∨ -b^{4, 268}_0
c  in DIMACS:
 8354  8355 -8356 -1068 -8357 0
 8354  8355 -8356 -1068  8358 0
 8354  8355 -8356 -1068 -8359 0

c  2+1 --> break 
c    (-b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 8354 -8355  8356 -1068 1162 0


c  2-1 --> 1
c    (-b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧ -p_1068) -> (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0)
c  in CNF:
c     b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_2
c     b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_1
c     b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨  b^{4, 268}_0
c  in DIMACS:
 8354 -8355  8356  1068 -8357 0
 8354 -8355  8356  1068 -8358 0
 8354 -8355  8356  1068  8359 0

c  1-1 --> 0
c    (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0 ∧ -p_1068) -> (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧ -b^{4, 268}_0)
c  in CNF:
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_2
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_1
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_0
c  in DIMACS:
 8354  8355 -8356  1068 -8357 0
 8354  8355 -8356  1068 -8358 0
 8354  8355 -8356  1068 -8359 0

c  0-1 --> -1
c    (-b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧ -p_1068) -> ( b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0)
c  in CNF:
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨  b^{4, 268}_2
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_1
c     b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨  b^{4, 268}_0
c  in DIMACS:
 8354  8355  8356  1068  8357 0
 8354  8355  8356  1068 -8358 0
 8354  8355  8356  1068  8359 0

c  -1-1 --> -2
c    ( b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧  b^{4, 267}_0 ∧ -p_1068) -> ( b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0)
c  in CNF:
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨  b^{4, 268}_2
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨  b^{4, 268}_1
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨  p_1068 ∨ -b^{4, 268}_0
c  in DIMACS:
-8354  8355 -8356  1068  8357 0
-8354  8355 -8356  1068  8358 0
-8354  8355 -8356  1068 -8359 0

c  -2-1 --> break 
c    ( b^{4, 267}_2 ∧  b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨  b^{4, 267}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-8354 -8355  8356  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 267}_2 ∧ -b^{4, 267}_1 ∧ -b^{4, 267}_0 ∧ true) 
c  in CNF:
c    -b^{4, 267}_2 ∨  b^{4, 267}_1 ∨  b^{4, 267}_0 ∨ false 
c  in DIMACS:
-8354  8355  8356  0

c  3 does not represent an automaton state.
c    -(-b^{4, 267}_2 ∧  b^{4, 267}_1 ∧  b^{4, 267}_0 ∧ true) 
c  in CNF:
c     b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ false 
c  in DIMACS:
 8354 -8355 -8356  0
c  -3 does not represent an automaton state.
c    -( b^{4, 267}_2 ∧  b^{4, 267}_1 ∧  b^{4, 267}_0 ∧ true) 
c  in CNF:
c    -b^{4, 267}_2 ∨ -b^{4, 267}_1 ∨ -b^{4, 267}_0 ∨ false 
c  in DIMACS:
-8354 -8355 -8356  0

c i = 268
c  -2+1 --> -1
c    ( b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧  p_1072) -> ( b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0)
c  in CNF:
c    -b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨  b^{4, 269}_2
c    -b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_1
c    -b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨  b^{4, 269}_0
c  in DIMACS:
-8357 -8358  8359 -1072  8360 0
-8357 -8358  8359 -1072 -8361 0
-8357 -8358  8359 -1072  8362 0

c  -1+1 --> 0
c    ( b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0 ∧  p_1072) -> (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧ -b^{4, 269}_0)
c  in CNF:
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_2
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_1
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_0
c  in DIMACS:
-8357  8358 -8359 -1072 -8360 0
-8357  8358 -8359 -1072 -8361 0
-8357  8358 -8359 -1072 -8362 0

c  0+1 --> 1
c    (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧  p_1072) -> (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0)
c  in CNF:
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_2
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_1
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨  b^{4, 269}_0
c  in DIMACS:
 8357  8358  8359 -1072 -8360 0
 8357  8358  8359 -1072 -8361 0
 8357  8358  8359 -1072  8362 0

c  1+1 --> 2
c    (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0 ∧  p_1072) -> (-b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0)
c  in CNF:
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_2
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨  b^{4, 269}_1
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ -p_1072 ∨ -b^{4, 269}_0
c  in DIMACS:
 8357  8358 -8359 -1072 -8360 0
 8357  8358 -8359 -1072  8361 0
 8357  8358 -8359 -1072 -8362 0

c  2+1 --> break 
c    (-b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 8357 -8358  8359 -1072 1162 0


c  2-1 --> 1
c    (-b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧ -p_1072) -> (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0)
c  in CNF:
c     b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_2
c     b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_1
c     b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨  b^{4, 269}_0
c  in DIMACS:
 8357 -8358  8359  1072 -8360 0
 8357 -8358  8359  1072 -8361 0
 8357 -8358  8359  1072  8362 0

c  1-1 --> 0
c    (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0 ∧ -p_1072) -> (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧ -b^{4, 269}_0)
c  in CNF:
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_2
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_1
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_0
c  in DIMACS:
 8357  8358 -8359  1072 -8360 0
 8357  8358 -8359  1072 -8361 0
 8357  8358 -8359  1072 -8362 0

c  0-1 --> -1
c    (-b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧ -p_1072) -> ( b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0)
c  in CNF:
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨  b^{4, 269}_2
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_1
c     b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨  b^{4, 269}_0
c  in DIMACS:
 8357  8358  8359  1072  8360 0
 8357  8358  8359  1072 -8361 0
 8357  8358  8359  1072  8362 0

c  -1-1 --> -2
c    ( b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧  b^{4, 268}_0 ∧ -p_1072) -> ( b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0)
c  in CNF:
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨  b^{4, 269}_2
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨  b^{4, 269}_1
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨  p_1072 ∨ -b^{4, 269}_0
c  in DIMACS:
-8357  8358 -8359  1072  8360 0
-8357  8358 -8359  1072  8361 0
-8357  8358 -8359  1072 -8362 0

c  -2-1 --> break 
c    ( b^{4, 268}_2 ∧  b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨  b^{4, 268}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-8357 -8358  8359  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 268}_2 ∧ -b^{4, 268}_1 ∧ -b^{4, 268}_0 ∧ true) 
c  in CNF:
c    -b^{4, 268}_2 ∨  b^{4, 268}_1 ∨  b^{4, 268}_0 ∨ false 
c  in DIMACS:
-8357  8358  8359  0

c  3 does not represent an automaton state.
c    -(-b^{4, 268}_2 ∧  b^{4, 268}_1 ∧  b^{4, 268}_0 ∧ true) 
c  in CNF:
c     b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ false 
c  in DIMACS:
 8357 -8358 -8359  0
c  -3 does not represent an automaton state.
c    -( b^{4, 268}_2 ∧  b^{4, 268}_1 ∧  b^{4, 268}_0 ∧ true) 
c  in CNF:
c    -b^{4, 268}_2 ∨ -b^{4, 268}_1 ∨ -b^{4, 268}_0 ∨ false 
c  in DIMACS:
-8357 -8358 -8359  0

c i = 269
c  -2+1 --> -1
c    ( b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧  p_1076) -> ( b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0)
c  in CNF:
c    -b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨  b^{4, 270}_2
c    -b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_1
c    -b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨  b^{4, 270}_0
c  in DIMACS:
-8360 -8361  8362 -1076  8363 0
-8360 -8361  8362 -1076 -8364 0
-8360 -8361  8362 -1076  8365 0

c  -1+1 --> 0
c    ( b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0 ∧  p_1076) -> (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧ -b^{4, 270}_0)
c  in CNF:
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_2
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_1
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_0
c  in DIMACS:
-8360  8361 -8362 -1076 -8363 0
-8360  8361 -8362 -1076 -8364 0
-8360  8361 -8362 -1076 -8365 0

c  0+1 --> 1
c    (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧  p_1076) -> (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0)
c  in CNF:
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_2
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_1
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨  b^{4, 270}_0
c  in DIMACS:
 8360  8361  8362 -1076 -8363 0
 8360  8361  8362 -1076 -8364 0
 8360  8361  8362 -1076  8365 0

c  1+1 --> 2
c    (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0 ∧  p_1076) -> (-b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0)
c  in CNF:
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_2
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨  b^{4, 270}_1
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ -p_1076 ∨ -b^{4, 270}_0
c  in DIMACS:
 8360  8361 -8362 -1076 -8363 0
 8360  8361 -8362 -1076  8364 0
 8360  8361 -8362 -1076 -8365 0

c  2+1 --> break 
c    (-b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧  p_1076) -> break
c  in CNF:
c     b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ -p_1076 ∨ break
c  in DIMACS:
 8360 -8361  8362 -1076 1162 0


c  2-1 --> 1
c    (-b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧ -p_1076) -> (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0)
c  in CNF:
c     b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_2
c     b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_1
c     b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨  b^{4, 270}_0
c  in DIMACS:
 8360 -8361  8362  1076 -8363 0
 8360 -8361  8362  1076 -8364 0
 8360 -8361  8362  1076  8365 0

c  1-1 --> 0
c    (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0 ∧ -p_1076) -> (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧ -b^{4, 270}_0)
c  in CNF:
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_2
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_1
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_0
c  in DIMACS:
 8360  8361 -8362  1076 -8363 0
 8360  8361 -8362  1076 -8364 0
 8360  8361 -8362  1076 -8365 0

c  0-1 --> -1
c    (-b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧ -p_1076) -> ( b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0)
c  in CNF:
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨  b^{4, 270}_2
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_1
c     b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨  b^{4, 270}_0
c  in DIMACS:
 8360  8361  8362  1076  8363 0
 8360  8361  8362  1076 -8364 0
 8360  8361  8362  1076  8365 0

c  -1-1 --> -2
c    ( b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧  b^{4, 269}_0 ∧ -p_1076) -> ( b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0)
c  in CNF:
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨  b^{4, 270}_2
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨  b^{4, 270}_1
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨  p_1076 ∨ -b^{4, 270}_0
c  in DIMACS:
-8360  8361 -8362  1076  8363 0
-8360  8361 -8362  1076  8364 0
-8360  8361 -8362  1076 -8365 0

c  -2-1 --> break 
c    ( b^{4, 269}_2 ∧  b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧ -p_1076) -> break
c  in CNF:
c    -b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨  b^{4, 269}_0 ∨  p_1076 ∨ break
c  in DIMACS:
-8360 -8361  8362  1076 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 269}_2 ∧ -b^{4, 269}_1 ∧ -b^{4, 269}_0 ∧ true) 
c  in CNF:
c    -b^{4, 269}_2 ∨  b^{4, 269}_1 ∨  b^{4, 269}_0 ∨ false 
c  in DIMACS:
-8360  8361  8362  0

c  3 does not represent an automaton state.
c    -(-b^{4, 269}_2 ∧  b^{4, 269}_1 ∧  b^{4, 269}_0 ∧ true) 
c  in CNF:
c     b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ false 
c  in DIMACS:
 8360 -8361 -8362  0
c  -3 does not represent an automaton state.
c    -( b^{4, 269}_2 ∧  b^{4, 269}_1 ∧  b^{4, 269}_0 ∧ true) 
c  in CNF:
c    -b^{4, 269}_2 ∨ -b^{4, 269}_1 ∨ -b^{4, 269}_0 ∨ false 
c  in DIMACS:
-8360 -8361 -8362  0

c i = 270
c  -2+1 --> -1
c    ( b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧  p_1080) -> ( b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0)
c  in CNF:
c    -b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨  b^{4, 271}_2
c    -b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_1
c    -b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨  b^{4, 271}_0
c  in DIMACS:
-8363 -8364  8365 -1080  8366 0
-8363 -8364  8365 -1080 -8367 0
-8363 -8364  8365 -1080  8368 0

c  -1+1 --> 0
c    ( b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0 ∧  p_1080) -> (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧ -b^{4, 271}_0)
c  in CNF:
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_2
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_1
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_0
c  in DIMACS:
-8363  8364 -8365 -1080 -8366 0
-8363  8364 -8365 -1080 -8367 0
-8363  8364 -8365 -1080 -8368 0

c  0+1 --> 1
c    (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧  p_1080) -> (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0)
c  in CNF:
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_2
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_1
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨  b^{4, 271}_0
c  in DIMACS:
 8363  8364  8365 -1080 -8366 0
 8363  8364  8365 -1080 -8367 0
 8363  8364  8365 -1080  8368 0

c  1+1 --> 2
c    (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0 ∧  p_1080) -> (-b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0)
c  in CNF:
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_2
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨  b^{4, 271}_1
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ -p_1080 ∨ -b^{4, 271}_0
c  in DIMACS:
 8363  8364 -8365 -1080 -8366 0
 8363  8364 -8365 -1080  8367 0
 8363  8364 -8365 -1080 -8368 0

c  2+1 --> break 
c    (-b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 8363 -8364  8365 -1080 1162 0


c  2-1 --> 1
c    (-b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧ -p_1080) -> (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0)
c  in CNF:
c     b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_2
c     b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_1
c     b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨  b^{4, 271}_0
c  in DIMACS:
 8363 -8364  8365  1080 -8366 0
 8363 -8364  8365  1080 -8367 0
 8363 -8364  8365  1080  8368 0

c  1-1 --> 0
c    (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0 ∧ -p_1080) -> (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧ -b^{4, 271}_0)
c  in CNF:
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_2
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_1
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_0
c  in DIMACS:
 8363  8364 -8365  1080 -8366 0
 8363  8364 -8365  1080 -8367 0
 8363  8364 -8365  1080 -8368 0

c  0-1 --> -1
c    (-b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧ -p_1080) -> ( b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0)
c  in CNF:
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨  b^{4, 271}_2
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_1
c     b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨  b^{4, 271}_0
c  in DIMACS:
 8363  8364  8365  1080  8366 0
 8363  8364  8365  1080 -8367 0
 8363  8364  8365  1080  8368 0

c  -1-1 --> -2
c    ( b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧  b^{4, 270}_0 ∧ -p_1080) -> ( b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0)
c  in CNF:
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨  b^{4, 271}_2
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨  b^{4, 271}_1
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨  p_1080 ∨ -b^{4, 271}_0
c  in DIMACS:
-8363  8364 -8365  1080  8366 0
-8363  8364 -8365  1080  8367 0
-8363  8364 -8365  1080 -8368 0

c  -2-1 --> break 
c    ( b^{4, 270}_2 ∧  b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨  b^{4, 270}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-8363 -8364  8365  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 270}_2 ∧ -b^{4, 270}_1 ∧ -b^{4, 270}_0 ∧ true) 
c  in CNF:
c    -b^{4, 270}_2 ∨  b^{4, 270}_1 ∨  b^{4, 270}_0 ∨ false 
c  in DIMACS:
-8363  8364  8365  0

c  3 does not represent an automaton state.
c    -(-b^{4, 270}_2 ∧  b^{4, 270}_1 ∧  b^{4, 270}_0 ∧ true) 
c  in CNF:
c     b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ false 
c  in DIMACS:
 8363 -8364 -8365  0
c  -3 does not represent an automaton state.
c    -( b^{4, 270}_2 ∧  b^{4, 270}_1 ∧  b^{4, 270}_0 ∧ true) 
c  in CNF:
c    -b^{4, 270}_2 ∨ -b^{4, 270}_1 ∨ -b^{4, 270}_0 ∨ false 
c  in DIMACS:
-8363 -8364 -8365  0

c i = 271
c  -2+1 --> -1
c    ( b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧  p_1084) -> ( b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0)
c  in CNF:
c    -b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨  b^{4, 272}_2
c    -b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_1
c    -b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨  b^{4, 272}_0
c  in DIMACS:
-8366 -8367  8368 -1084  8369 0
-8366 -8367  8368 -1084 -8370 0
-8366 -8367  8368 -1084  8371 0

c  -1+1 --> 0
c    ( b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0 ∧  p_1084) -> (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧ -b^{4, 272}_0)
c  in CNF:
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_2
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_1
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_0
c  in DIMACS:
-8366  8367 -8368 -1084 -8369 0
-8366  8367 -8368 -1084 -8370 0
-8366  8367 -8368 -1084 -8371 0

c  0+1 --> 1
c    (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧  p_1084) -> (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0)
c  in CNF:
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_2
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_1
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨  b^{4, 272}_0
c  in DIMACS:
 8366  8367  8368 -1084 -8369 0
 8366  8367  8368 -1084 -8370 0
 8366  8367  8368 -1084  8371 0

c  1+1 --> 2
c    (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0 ∧  p_1084) -> (-b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0)
c  in CNF:
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_2
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨  b^{4, 272}_1
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ -p_1084 ∨ -b^{4, 272}_0
c  in DIMACS:
 8366  8367 -8368 -1084 -8369 0
 8366  8367 -8368 -1084  8370 0
 8366  8367 -8368 -1084 -8371 0

c  2+1 --> break 
c    (-b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧  p_1084) -> break
c  in CNF:
c     b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ -p_1084 ∨ break
c  in DIMACS:
 8366 -8367  8368 -1084 1162 0


c  2-1 --> 1
c    (-b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧ -p_1084) -> (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0)
c  in CNF:
c     b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_2
c     b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_1
c     b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨  b^{4, 272}_0
c  in DIMACS:
 8366 -8367  8368  1084 -8369 0
 8366 -8367  8368  1084 -8370 0
 8366 -8367  8368  1084  8371 0

c  1-1 --> 0
c    (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0 ∧ -p_1084) -> (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧ -b^{4, 272}_0)
c  in CNF:
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_2
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_1
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_0
c  in DIMACS:
 8366  8367 -8368  1084 -8369 0
 8366  8367 -8368  1084 -8370 0
 8366  8367 -8368  1084 -8371 0

c  0-1 --> -1
c    (-b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧ -p_1084) -> ( b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0)
c  in CNF:
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨  b^{4, 272}_2
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_1
c     b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨  b^{4, 272}_0
c  in DIMACS:
 8366  8367  8368  1084  8369 0
 8366  8367  8368  1084 -8370 0
 8366  8367  8368  1084  8371 0

c  -1-1 --> -2
c    ( b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧  b^{4, 271}_0 ∧ -p_1084) -> ( b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0)
c  in CNF:
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨  b^{4, 272}_2
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨  b^{4, 272}_1
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨  p_1084 ∨ -b^{4, 272}_0
c  in DIMACS:
-8366  8367 -8368  1084  8369 0
-8366  8367 -8368  1084  8370 0
-8366  8367 -8368  1084 -8371 0

c  -2-1 --> break 
c    ( b^{4, 271}_2 ∧  b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧ -p_1084) -> break
c  in CNF:
c    -b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨  b^{4, 271}_0 ∨  p_1084 ∨ break
c  in DIMACS:
-8366 -8367  8368  1084 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 271}_2 ∧ -b^{4, 271}_1 ∧ -b^{4, 271}_0 ∧ true) 
c  in CNF:
c    -b^{4, 271}_2 ∨  b^{4, 271}_1 ∨  b^{4, 271}_0 ∨ false 
c  in DIMACS:
-8366  8367  8368  0

c  3 does not represent an automaton state.
c    -(-b^{4, 271}_2 ∧  b^{4, 271}_1 ∧  b^{4, 271}_0 ∧ true) 
c  in CNF:
c     b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ false 
c  in DIMACS:
 8366 -8367 -8368  0
c  -3 does not represent an automaton state.
c    -( b^{4, 271}_2 ∧  b^{4, 271}_1 ∧  b^{4, 271}_0 ∧ true) 
c  in CNF:
c    -b^{4, 271}_2 ∨ -b^{4, 271}_1 ∨ -b^{4, 271}_0 ∨ false 
c  in DIMACS:
-8366 -8367 -8368  0

c i = 272
c  -2+1 --> -1
c    ( b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧  p_1088) -> ( b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0)
c  in CNF:
c    -b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨  b^{4, 273}_2
c    -b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_1
c    -b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨  b^{4, 273}_0
c  in DIMACS:
-8369 -8370  8371 -1088  8372 0
-8369 -8370  8371 -1088 -8373 0
-8369 -8370  8371 -1088  8374 0

c  -1+1 --> 0
c    ( b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0 ∧  p_1088) -> (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧ -b^{4, 273}_0)
c  in CNF:
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_2
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_1
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_0
c  in DIMACS:
-8369  8370 -8371 -1088 -8372 0
-8369  8370 -8371 -1088 -8373 0
-8369  8370 -8371 -1088 -8374 0

c  0+1 --> 1
c    (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧  p_1088) -> (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0)
c  in CNF:
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_2
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_1
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨  b^{4, 273}_0
c  in DIMACS:
 8369  8370  8371 -1088 -8372 0
 8369  8370  8371 -1088 -8373 0
 8369  8370  8371 -1088  8374 0

c  1+1 --> 2
c    (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0 ∧  p_1088) -> (-b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0)
c  in CNF:
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_2
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨  b^{4, 273}_1
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ -p_1088 ∨ -b^{4, 273}_0
c  in DIMACS:
 8369  8370 -8371 -1088 -8372 0
 8369  8370 -8371 -1088  8373 0
 8369  8370 -8371 -1088 -8374 0

c  2+1 --> break 
c    (-b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 8369 -8370  8371 -1088 1162 0


c  2-1 --> 1
c    (-b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧ -p_1088) -> (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0)
c  in CNF:
c     b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_2
c     b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_1
c     b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨  b^{4, 273}_0
c  in DIMACS:
 8369 -8370  8371  1088 -8372 0
 8369 -8370  8371  1088 -8373 0
 8369 -8370  8371  1088  8374 0

c  1-1 --> 0
c    (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0 ∧ -p_1088) -> (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧ -b^{4, 273}_0)
c  in CNF:
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_2
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_1
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_0
c  in DIMACS:
 8369  8370 -8371  1088 -8372 0
 8369  8370 -8371  1088 -8373 0
 8369  8370 -8371  1088 -8374 0

c  0-1 --> -1
c    (-b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧ -p_1088) -> ( b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0)
c  in CNF:
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨  b^{4, 273}_2
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_1
c     b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨  b^{4, 273}_0
c  in DIMACS:
 8369  8370  8371  1088  8372 0
 8369  8370  8371  1088 -8373 0
 8369  8370  8371  1088  8374 0

c  -1-1 --> -2
c    ( b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧  b^{4, 272}_0 ∧ -p_1088) -> ( b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0)
c  in CNF:
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨  b^{4, 273}_2
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨  b^{4, 273}_1
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨  p_1088 ∨ -b^{4, 273}_0
c  in DIMACS:
-8369  8370 -8371  1088  8372 0
-8369  8370 -8371  1088  8373 0
-8369  8370 -8371  1088 -8374 0

c  -2-1 --> break 
c    ( b^{4, 272}_2 ∧  b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨  b^{4, 272}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-8369 -8370  8371  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 272}_2 ∧ -b^{4, 272}_1 ∧ -b^{4, 272}_0 ∧ true) 
c  in CNF:
c    -b^{4, 272}_2 ∨  b^{4, 272}_1 ∨  b^{4, 272}_0 ∨ false 
c  in DIMACS:
-8369  8370  8371  0

c  3 does not represent an automaton state.
c    -(-b^{4, 272}_2 ∧  b^{4, 272}_1 ∧  b^{4, 272}_0 ∧ true) 
c  in CNF:
c     b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ false 
c  in DIMACS:
 8369 -8370 -8371  0
c  -3 does not represent an automaton state.
c    -( b^{4, 272}_2 ∧  b^{4, 272}_1 ∧  b^{4, 272}_0 ∧ true) 
c  in CNF:
c    -b^{4, 272}_2 ∨ -b^{4, 272}_1 ∨ -b^{4, 272}_0 ∨ false 
c  in DIMACS:
-8369 -8370 -8371  0

c i = 273
c  -2+1 --> -1
c    ( b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧  p_1092) -> ( b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0)
c  in CNF:
c    -b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨  b^{4, 274}_2
c    -b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_1
c    -b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨  b^{4, 274}_0
c  in DIMACS:
-8372 -8373  8374 -1092  8375 0
-8372 -8373  8374 -1092 -8376 0
-8372 -8373  8374 -1092  8377 0

c  -1+1 --> 0
c    ( b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0 ∧  p_1092) -> (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧ -b^{4, 274}_0)
c  in CNF:
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_2
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_1
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_0
c  in DIMACS:
-8372  8373 -8374 -1092 -8375 0
-8372  8373 -8374 -1092 -8376 0
-8372  8373 -8374 -1092 -8377 0

c  0+1 --> 1
c    (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧  p_1092) -> (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0)
c  in CNF:
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_2
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_1
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨  b^{4, 274}_0
c  in DIMACS:
 8372  8373  8374 -1092 -8375 0
 8372  8373  8374 -1092 -8376 0
 8372  8373  8374 -1092  8377 0

c  1+1 --> 2
c    (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0 ∧  p_1092) -> (-b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0)
c  in CNF:
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_2
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨  b^{4, 274}_1
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ -p_1092 ∨ -b^{4, 274}_0
c  in DIMACS:
 8372  8373 -8374 -1092 -8375 0
 8372  8373 -8374 -1092  8376 0
 8372  8373 -8374 -1092 -8377 0

c  2+1 --> break 
c    (-b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 8372 -8373  8374 -1092 1162 0


c  2-1 --> 1
c    (-b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧ -p_1092) -> (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0)
c  in CNF:
c     b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_2
c     b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_1
c     b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨  b^{4, 274}_0
c  in DIMACS:
 8372 -8373  8374  1092 -8375 0
 8372 -8373  8374  1092 -8376 0
 8372 -8373  8374  1092  8377 0

c  1-1 --> 0
c    (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0 ∧ -p_1092) -> (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧ -b^{4, 274}_0)
c  in CNF:
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_2
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_1
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_0
c  in DIMACS:
 8372  8373 -8374  1092 -8375 0
 8372  8373 -8374  1092 -8376 0
 8372  8373 -8374  1092 -8377 0

c  0-1 --> -1
c    (-b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧ -p_1092) -> ( b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0)
c  in CNF:
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨  b^{4, 274}_2
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_1
c     b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨  b^{4, 274}_0
c  in DIMACS:
 8372  8373  8374  1092  8375 0
 8372  8373  8374  1092 -8376 0
 8372  8373  8374  1092  8377 0

c  -1-1 --> -2
c    ( b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧  b^{4, 273}_0 ∧ -p_1092) -> ( b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0)
c  in CNF:
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨  b^{4, 274}_2
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨  b^{4, 274}_1
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨  p_1092 ∨ -b^{4, 274}_0
c  in DIMACS:
-8372  8373 -8374  1092  8375 0
-8372  8373 -8374  1092  8376 0
-8372  8373 -8374  1092 -8377 0

c  -2-1 --> break 
c    ( b^{4, 273}_2 ∧  b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨  b^{4, 273}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-8372 -8373  8374  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 273}_2 ∧ -b^{4, 273}_1 ∧ -b^{4, 273}_0 ∧ true) 
c  in CNF:
c    -b^{4, 273}_2 ∨  b^{4, 273}_1 ∨  b^{4, 273}_0 ∨ false 
c  in DIMACS:
-8372  8373  8374  0

c  3 does not represent an automaton state.
c    -(-b^{4, 273}_2 ∧  b^{4, 273}_1 ∧  b^{4, 273}_0 ∧ true) 
c  in CNF:
c     b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ false 
c  in DIMACS:
 8372 -8373 -8374  0
c  -3 does not represent an automaton state.
c    -( b^{4, 273}_2 ∧  b^{4, 273}_1 ∧  b^{4, 273}_0 ∧ true) 
c  in CNF:
c    -b^{4, 273}_2 ∨ -b^{4, 273}_1 ∨ -b^{4, 273}_0 ∨ false 
c  in DIMACS:
-8372 -8373 -8374  0

c i = 274
c  -2+1 --> -1
c    ( b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧  p_1096) -> ( b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0)
c  in CNF:
c    -b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨  b^{4, 275}_2
c    -b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_1
c    -b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨  b^{4, 275}_0
c  in DIMACS:
-8375 -8376  8377 -1096  8378 0
-8375 -8376  8377 -1096 -8379 0
-8375 -8376  8377 -1096  8380 0

c  -1+1 --> 0
c    ( b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0 ∧  p_1096) -> (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧ -b^{4, 275}_0)
c  in CNF:
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_2
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_1
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_0
c  in DIMACS:
-8375  8376 -8377 -1096 -8378 0
-8375  8376 -8377 -1096 -8379 0
-8375  8376 -8377 -1096 -8380 0

c  0+1 --> 1
c    (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧  p_1096) -> (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0)
c  in CNF:
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_2
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_1
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨  b^{4, 275}_0
c  in DIMACS:
 8375  8376  8377 -1096 -8378 0
 8375  8376  8377 -1096 -8379 0
 8375  8376  8377 -1096  8380 0

c  1+1 --> 2
c    (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0 ∧  p_1096) -> (-b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0)
c  in CNF:
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_2
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨  b^{4, 275}_1
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ -p_1096 ∨ -b^{4, 275}_0
c  in DIMACS:
 8375  8376 -8377 -1096 -8378 0
 8375  8376 -8377 -1096  8379 0
 8375  8376 -8377 -1096 -8380 0

c  2+1 --> break 
c    (-b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 8375 -8376  8377 -1096 1162 0


c  2-1 --> 1
c    (-b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧ -p_1096) -> (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0)
c  in CNF:
c     b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_2
c     b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_1
c     b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨  b^{4, 275}_0
c  in DIMACS:
 8375 -8376  8377  1096 -8378 0
 8375 -8376  8377  1096 -8379 0
 8375 -8376  8377  1096  8380 0

c  1-1 --> 0
c    (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0 ∧ -p_1096) -> (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧ -b^{4, 275}_0)
c  in CNF:
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_2
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_1
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_0
c  in DIMACS:
 8375  8376 -8377  1096 -8378 0
 8375  8376 -8377  1096 -8379 0
 8375  8376 -8377  1096 -8380 0

c  0-1 --> -1
c    (-b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧ -p_1096) -> ( b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0)
c  in CNF:
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨  b^{4, 275}_2
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_1
c     b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨  b^{4, 275}_0
c  in DIMACS:
 8375  8376  8377  1096  8378 0
 8375  8376  8377  1096 -8379 0
 8375  8376  8377  1096  8380 0

c  -1-1 --> -2
c    ( b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧  b^{4, 274}_0 ∧ -p_1096) -> ( b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0)
c  in CNF:
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨  b^{4, 275}_2
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨  b^{4, 275}_1
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨  p_1096 ∨ -b^{4, 275}_0
c  in DIMACS:
-8375  8376 -8377  1096  8378 0
-8375  8376 -8377  1096  8379 0
-8375  8376 -8377  1096 -8380 0

c  -2-1 --> break 
c    ( b^{4, 274}_2 ∧  b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨  b^{4, 274}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-8375 -8376  8377  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 274}_2 ∧ -b^{4, 274}_1 ∧ -b^{4, 274}_0 ∧ true) 
c  in CNF:
c    -b^{4, 274}_2 ∨  b^{4, 274}_1 ∨  b^{4, 274}_0 ∨ false 
c  in DIMACS:
-8375  8376  8377  0

c  3 does not represent an automaton state.
c    -(-b^{4, 274}_2 ∧  b^{4, 274}_1 ∧  b^{4, 274}_0 ∧ true) 
c  in CNF:
c     b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ false 
c  in DIMACS:
 8375 -8376 -8377  0
c  -3 does not represent an automaton state.
c    -( b^{4, 274}_2 ∧  b^{4, 274}_1 ∧  b^{4, 274}_0 ∧ true) 
c  in CNF:
c    -b^{4, 274}_2 ∨ -b^{4, 274}_1 ∨ -b^{4, 274}_0 ∨ false 
c  in DIMACS:
-8375 -8376 -8377  0

c i = 275
c  -2+1 --> -1
c    ( b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧  p_1100) -> ( b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0)
c  in CNF:
c    -b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨  b^{4, 276}_2
c    -b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_1
c    -b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨  b^{4, 276}_0
c  in DIMACS:
-8378 -8379  8380 -1100  8381 0
-8378 -8379  8380 -1100 -8382 0
-8378 -8379  8380 -1100  8383 0

c  -1+1 --> 0
c    ( b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0 ∧  p_1100) -> (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧ -b^{4, 276}_0)
c  in CNF:
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_2
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_1
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_0
c  in DIMACS:
-8378  8379 -8380 -1100 -8381 0
-8378  8379 -8380 -1100 -8382 0
-8378  8379 -8380 -1100 -8383 0

c  0+1 --> 1
c    (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧  p_1100) -> (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0)
c  in CNF:
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_2
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_1
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨  b^{4, 276}_0
c  in DIMACS:
 8378  8379  8380 -1100 -8381 0
 8378  8379  8380 -1100 -8382 0
 8378  8379  8380 -1100  8383 0

c  1+1 --> 2
c    (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0 ∧  p_1100) -> (-b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0)
c  in CNF:
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_2
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨  b^{4, 276}_1
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ -p_1100 ∨ -b^{4, 276}_0
c  in DIMACS:
 8378  8379 -8380 -1100 -8381 0
 8378  8379 -8380 -1100  8382 0
 8378  8379 -8380 -1100 -8383 0

c  2+1 --> break 
c    (-b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 8378 -8379  8380 -1100 1162 0


c  2-1 --> 1
c    (-b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧ -p_1100) -> (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0)
c  in CNF:
c     b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_2
c     b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_1
c     b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨  b^{4, 276}_0
c  in DIMACS:
 8378 -8379  8380  1100 -8381 0
 8378 -8379  8380  1100 -8382 0
 8378 -8379  8380  1100  8383 0

c  1-1 --> 0
c    (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0 ∧ -p_1100) -> (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧ -b^{4, 276}_0)
c  in CNF:
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_2
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_1
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_0
c  in DIMACS:
 8378  8379 -8380  1100 -8381 0
 8378  8379 -8380  1100 -8382 0
 8378  8379 -8380  1100 -8383 0

c  0-1 --> -1
c    (-b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧ -p_1100) -> ( b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0)
c  in CNF:
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨  b^{4, 276}_2
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_1
c     b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨  b^{4, 276}_0
c  in DIMACS:
 8378  8379  8380  1100  8381 0
 8378  8379  8380  1100 -8382 0
 8378  8379  8380  1100  8383 0

c  -1-1 --> -2
c    ( b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧  b^{4, 275}_0 ∧ -p_1100) -> ( b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0)
c  in CNF:
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨  b^{4, 276}_2
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨  b^{4, 276}_1
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨  p_1100 ∨ -b^{4, 276}_0
c  in DIMACS:
-8378  8379 -8380  1100  8381 0
-8378  8379 -8380  1100  8382 0
-8378  8379 -8380  1100 -8383 0

c  -2-1 --> break 
c    ( b^{4, 275}_2 ∧  b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨  b^{4, 275}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-8378 -8379  8380  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 275}_2 ∧ -b^{4, 275}_1 ∧ -b^{4, 275}_0 ∧ true) 
c  in CNF:
c    -b^{4, 275}_2 ∨  b^{4, 275}_1 ∨  b^{4, 275}_0 ∨ false 
c  in DIMACS:
-8378  8379  8380  0

c  3 does not represent an automaton state.
c    -(-b^{4, 275}_2 ∧  b^{4, 275}_1 ∧  b^{4, 275}_0 ∧ true) 
c  in CNF:
c     b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ false 
c  in DIMACS:
 8378 -8379 -8380  0
c  -3 does not represent an automaton state.
c    -( b^{4, 275}_2 ∧  b^{4, 275}_1 ∧  b^{4, 275}_0 ∧ true) 
c  in CNF:
c    -b^{4, 275}_2 ∨ -b^{4, 275}_1 ∨ -b^{4, 275}_0 ∨ false 
c  in DIMACS:
-8378 -8379 -8380  0

c i = 276
c  -2+1 --> -1
c    ( b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧  p_1104) -> ( b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0)
c  in CNF:
c    -b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨  b^{4, 277}_2
c    -b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_1
c    -b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨  b^{4, 277}_0
c  in DIMACS:
-8381 -8382  8383 -1104  8384 0
-8381 -8382  8383 -1104 -8385 0
-8381 -8382  8383 -1104  8386 0

c  -1+1 --> 0
c    ( b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0 ∧  p_1104) -> (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧ -b^{4, 277}_0)
c  in CNF:
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_2
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_1
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_0
c  in DIMACS:
-8381  8382 -8383 -1104 -8384 0
-8381  8382 -8383 -1104 -8385 0
-8381  8382 -8383 -1104 -8386 0

c  0+1 --> 1
c    (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧  p_1104) -> (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0)
c  in CNF:
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_2
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_1
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨  b^{4, 277}_0
c  in DIMACS:
 8381  8382  8383 -1104 -8384 0
 8381  8382  8383 -1104 -8385 0
 8381  8382  8383 -1104  8386 0

c  1+1 --> 2
c    (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0 ∧  p_1104) -> (-b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0)
c  in CNF:
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_2
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨  b^{4, 277}_1
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ -p_1104 ∨ -b^{4, 277}_0
c  in DIMACS:
 8381  8382 -8383 -1104 -8384 0
 8381  8382 -8383 -1104  8385 0
 8381  8382 -8383 -1104 -8386 0

c  2+1 --> break 
c    (-b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 8381 -8382  8383 -1104 1162 0


c  2-1 --> 1
c    (-b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧ -p_1104) -> (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0)
c  in CNF:
c     b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_2
c     b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_1
c     b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨  b^{4, 277}_0
c  in DIMACS:
 8381 -8382  8383  1104 -8384 0
 8381 -8382  8383  1104 -8385 0
 8381 -8382  8383  1104  8386 0

c  1-1 --> 0
c    (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0 ∧ -p_1104) -> (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧ -b^{4, 277}_0)
c  in CNF:
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_2
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_1
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_0
c  in DIMACS:
 8381  8382 -8383  1104 -8384 0
 8381  8382 -8383  1104 -8385 0
 8381  8382 -8383  1104 -8386 0

c  0-1 --> -1
c    (-b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧ -p_1104) -> ( b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0)
c  in CNF:
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨  b^{4, 277}_2
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_1
c     b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨  b^{4, 277}_0
c  in DIMACS:
 8381  8382  8383  1104  8384 0
 8381  8382  8383  1104 -8385 0
 8381  8382  8383  1104  8386 0

c  -1-1 --> -2
c    ( b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧  b^{4, 276}_0 ∧ -p_1104) -> ( b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0)
c  in CNF:
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨  b^{4, 277}_2
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨  b^{4, 277}_1
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨  p_1104 ∨ -b^{4, 277}_0
c  in DIMACS:
-8381  8382 -8383  1104  8384 0
-8381  8382 -8383  1104  8385 0
-8381  8382 -8383  1104 -8386 0

c  -2-1 --> break 
c    ( b^{4, 276}_2 ∧  b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨  b^{4, 276}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-8381 -8382  8383  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 276}_2 ∧ -b^{4, 276}_1 ∧ -b^{4, 276}_0 ∧ true) 
c  in CNF:
c    -b^{4, 276}_2 ∨  b^{4, 276}_1 ∨  b^{4, 276}_0 ∨ false 
c  in DIMACS:
-8381  8382  8383  0

c  3 does not represent an automaton state.
c    -(-b^{4, 276}_2 ∧  b^{4, 276}_1 ∧  b^{4, 276}_0 ∧ true) 
c  in CNF:
c     b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ false 
c  in DIMACS:
 8381 -8382 -8383  0
c  -3 does not represent an automaton state.
c    -( b^{4, 276}_2 ∧  b^{4, 276}_1 ∧  b^{4, 276}_0 ∧ true) 
c  in CNF:
c    -b^{4, 276}_2 ∨ -b^{4, 276}_1 ∨ -b^{4, 276}_0 ∨ false 
c  in DIMACS:
-8381 -8382 -8383  0

c i = 277
c  -2+1 --> -1
c    ( b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧  p_1108) -> ( b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0)
c  in CNF:
c    -b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨  b^{4, 278}_2
c    -b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_1
c    -b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨  b^{4, 278}_0
c  in DIMACS:
-8384 -8385  8386 -1108  8387 0
-8384 -8385  8386 -1108 -8388 0
-8384 -8385  8386 -1108  8389 0

c  -1+1 --> 0
c    ( b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0 ∧  p_1108) -> (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧ -b^{4, 278}_0)
c  in CNF:
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_2
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_1
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_0
c  in DIMACS:
-8384  8385 -8386 -1108 -8387 0
-8384  8385 -8386 -1108 -8388 0
-8384  8385 -8386 -1108 -8389 0

c  0+1 --> 1
c    (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧  p_1108) -> (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0)
c  in CNF:
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_2
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_1
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨  b^{4, 278}_0
c  in DIMACS:
 8384  8385  8386 -1108 -8387 0
 8384  8385  8386 -1108 -8388 0
 8384  8385  8386 -1108  8389 0

c  1+1 --> 2
c    (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0 ∧  p_1108) -> (-b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0)
c  in CNF:
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_2
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨  b^{4, 278}_1
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ -p_1108 ∨ -b^{4, 278}_0
c  in DIMACS:
 8384  8385 -8386 -1108 -8387 0
 8384  8385 -8386 -1108  8388 0
 8384  8385 -8386 -1108 -8389 0

c  2+1 --> break 
c    (-b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧  p_1108) -> break
c  in CNF:
c     b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ -p_1108 ∨ break
c  in DIMACS:
 8384 -8385  8386 -1108 1162 0


c  2-1 --> 1
c    (-b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧ -p_1108) -> (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0)
c  in CNF:
c     b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_2
c     b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_1
c     b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨  b^{4, 278}_0
c  in DIMACS:
 8384 -8385  8386  1108 -8387 0
 8384 -8385  8386  1108 -8388 0
 8384 -8385  8386  1108  8389 0

c  1-1 --> 0
c    (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0 ∧ -p_1108) -> (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧ -b^{4, 278}_0)
c  in CNF:
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_2
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_1
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_0
c  in DIMACS:
 8384  8385 -8386  1108 -8387 0
 8384  8385 -8386  1108 -8388 0
 8384  8385 -8386  1108 -8389 0

c  0-1 --> -1
c    (-b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧ -p_1108) -> ( b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0)
c  in CNF:
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨  b^{4, 278}_2
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_1
c     b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨  b^{4, 278}_0
c  in DIMACS:
 8384  8385  8386  1108  8387 0
 8384  8385  8386  1108 -8388 0
 8384  8385  8386  1108  8389 0

c  -1-1 --> -2
c    ( b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧  b^{4, 277}_0 ∧ -p_1108) -> ( b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0)
c  in CNF:
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨  b^{4, 278}_2
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨  b^{4, 278}_1
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨  p_1108 ∨ -b^{4, 278}_0
c  in DIMACS:
-8384  8385 -8386  1108  8387 0
-8384  8385 -8386  1108  8388 0
-8384  8385 -8386  1108 -8389 0

c  -2-1 --> break 
c    ( b^{4, 277}_2 ∧  b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧ -p_1108) -> break
c  in CNF:
c    -b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨  b^{4, 277}_0 ∨  p_1108 ∨ break
c  in DIMACS:
-8384 -8385  8386  1108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 277}_2 ∧ -b^{4, 277}_1 ∧ -b^{4, 277}_0 ∧ true) 
c  in CNF:
c    -b^{4, 277}_2 ∨  b^{4, 277}_1 ∨  b^{4, 277}_0 ∨ false 
c  in DIMACS:
-8384  8385  8386  0

c  3 does not represent an automaton state.
c    -(-b^{4, 277}_2 ∧  b^{4, 277}_1 ∧  b^{4, 277}_0 ∧ true) 
c  in CNF:
c     b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ false 
c  in DIMACS:
 8384 -8385 -8386  0
c  -3 does not represent an automaton state.
c    -( b^{4, 277}_2 ∧  b^{4, 277}_1 ∧  b^{4, 277}_0 ∧ true) 
c  in CNF:
c    -b^{4, 277}_2 ∨ -b^{4, 277}_1 ∨ -b^{4, 277}_0 ∨ false 
c  in DIMACS:
-8384 -8385 -8386  0

c i = 278
c  -2+1 --> -1
c    ( b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧  p_1112) -> ( b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0)
c  in CNF:
c    -b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨  b^{4, 279}_2
c    -b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_1
c    -b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨  b^{4, 279}_0
c  in DIMACS:
-8387 -8388  8389 -1112  8390 0
-8387 -8388  8389 -1112 -8391 0
-8387 -8388  8389 -1112  8392 0

c  -1+1 --> 0
c    ( b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0 ∧  p_1112) -> (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧ -b^{4, 279}_0)
c  in CNF:
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_2
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_1
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_0
c  in DIMACS:
-8387  8388 -8389 -1112 -8390 0
-8387  8388 -8389 -1112 -8391 0
-8387  8388 -8389 -1112 -8392 0

c  0+1 --> 1
c    (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧  p_1112) -> (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0)
c  in CNF:
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_2
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_1
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨  b^{4, 279}_0
c  in DIMACS:
 8387  8388  8389 -1112 -8390 0
 8387  8388  8389 -1112 -8391 0
 8387  8388  8389 -1112  8392 0

c  1+1 --> 2
c    (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0 ∧  p_1112) -> (-b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0)
c  in CNF:
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_2
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨  b^{4, 279}_1
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ -p_1112 ∨ -b^{4, 279}_0
c  in DIMACS:
 8387  8388 -8389 -1112 -8390 0
 8387  8388 -8389 -1112  8391 0
 8387  8388 -8389 -1112 -8392 0

c  2+1 --> break 
c    (-b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 8387 -8388  8389 -1112 1162 0


c  2-1 --> 1
c    (-b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧ -p_1112) -> (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0)
c  in CNF:
c     b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_2
c     b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_1
c     b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨  b^{4, 279}_0
c  in DIMACS:
 8387 -8388  8389  1112 -8390 0
 8387 -8388  8389  1112 -8391 0
 8387 -8388  8389  1112  8392 0

c  1-1 --> 0
c    (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0 ∧ -p_1112) -> (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧ -b^{4, 279}_0)
c  in CNF:
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_2
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_1
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_0
c  in DIMACS:
 8387  8388 -8389  1112 -8390 0
 8387  8388 -8389  1112 -8391 0
 8387  8388 -8389  1112 -8392 0

c  0-1 --> -1
c    (-b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧ -p_1112) -> ( b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0)
c  in CNF:
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨  b^{4, 279}_2
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_1
c     b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨  b^{4, 279}_0
c  in DIMACS:
 8387  8388  8389  1112  8390 0
 8387  8388  8389  1112 -8391 0
 8387  8388  8389  1112  8392 0

c  -1-1 --> -2
c    ( b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧  b^{4, 278}_0 ∧ -p_1112) -> ( b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0)
c  in CNF:
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨  b^{4, 279}_2
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨  b^{4, 279}_1
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨  p_1112 ∨ -b^{4, 279}_0
c  in DIMACS:
-8387  8388 -8389  1112  8390 0
-8387  8388 -8389  1112  8391 0
-8387  8388 -8389  1112 -8392 0

c  -2-1 --> break 
c    ( b^{4, 278}_2 ∧  b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨  b^{4, 278}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-8387 -8388  8389  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 278}_2 ∧ -b^{4, 278}_1 ∧ -b^{4, 278}_0 ∧ true) 
c  in CNF:
c    -b^{4, 278}_2 ∨  b^{4, 278}_1 ∨  b^{4, 278}_0 ∨ false 
c  in DIMACS:
-8387  8388  8389  0

c  3 does not represent an automaton state.
c    -(-b^{4, 278}_2 ∧  b^{4, 278}_1 ∧  b^{4, 278}_0 ∧ true) 
c  in CNF:
c     b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ false 
c  in DIMACS:
 8387 -8388 -8389  0
c  -3 does not represent an automaton state.
c    -( b^{4, 278}_2 ∧  b^{4, 278}_1 ∧  b^{4, 278}_0 ∧ true) 
c  in CNF:
c    -b^{4, 278}_2 ∨ -b^{4, 278}_1 ∨ -b^{4, 278}_0 ∨ false 
c  in DIMACS:
-8387 -8388 -8389  0

c i = 279
c  -2+1 --> -1
c    ( b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧  p_1116) -> ( b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0)
c  in CNF:
c    -b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨  b^{4, 280}_2
c    -b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_1
c    -b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨  b^{4, 280}_0
c  in DIMACS:
-8390 -8391  8392 -1116  8393 0
-8390 -8391  8392 -1116 -8394 0
-8390 -8391  8392 -1116  8395 0

c  -1+1 --> 0
c    ( b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0 ∧  p_1116) -> (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧ -b^{4, 280}_0)
c  in CNF:
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_2
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_1
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_0
c  in DIMACS:
-8390  8391 -8392 -1116 -8393 0
-8390  8391 -8392 -1116 -8394 0
-8390  8391 -8392 -1116 -8395 0

c  0+1 --> 1
c    (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧  p_1116) -> (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0)
c  in CNF:
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_2
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_1
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨  b^{4, 280}_0
c  in DIMACS:
 8390  8391  8392 -1116 -8393 0
 8390  8391  8392 -1116 -8394 0
 8390  8391  8392 -1116  8395 0

c  1+1 --> 2
c    (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0 ∧  p_1116) -> (-b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0)
c  in CNF:
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_2
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨  b^{4, 280}_1
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ -p_1116 ∨ -b^{4, 280}_0
c  in DIMACS:
 8390  8391 -8392 -1116 -8393 0
 8390  8391 -8392 -1116  8394 0
 8390  8391 -8392 -1116 -8395 0

c  2+1 --> break 
c    (-b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 8390 -8391  8392 -1116 1162 0


c  2-1 --> 1
c    (-b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧ -p_1116) -> (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0)
c  in CNF:
c     b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_2
c     b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_1
c     b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨  b^{4, 280}_0
c  in DIMACS:
 8390 -8391  8392  1116 -8393 0
 8390 -8391  8392  1116 -8394 0
 8390 -8391  8392  1116  8395 0

c  1-1 --> 0
c    (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0 ∧ -p_1116) -> (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧ -b^{4, 280}_0)
c  in CNF:
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_2
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_1
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_0
c  in DIMACS:
 8390  8391 -8392  1116 -8393 0
 8390  8391 -8392  1116 -8394 0
 8390  8391 -8392  1116 -8395 0

c  0-1 --> -1
c    (-b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧ -p_1116) -> ( b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0)
c  in CNF:
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨  b^{4, 280}_2
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_1
c     b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨  b^{4, 280}_0
c  in DIMACS:
 8390  8391  8392  1116  8393 0
 8390  8391  8392  1116 -8394 0
 8390  8391  8392  1116  8395 0

c  -1-1 --> -2
c    ( b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧  b^{4, 279}_0 ∧ -p_1116) -> ( b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0)
c  in CNF:
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨  b^{4, 280}_2
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨  b^{4, 280}_1
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨  p_1116 ∨ -b^{4, 280}_0
c  in DIMACS:
-8390  8391 -8392  1116  8393 0
-8390  8391 -8392  1116  8394 0
-8390  8391 -8392  1116 -8395 0

c  -2-1 --> break 
c    ( b^{4, 279}_2 ∧  b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨  b^{4, 279}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-8390 -8391  8392  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 279}_2 ∧ -b^{4, 279}_1 ∧ -b^{4, 279}_0 ∧ true) 
c  in CNF:
c    -b^{4, 279}_2 ∨  b^{4, 279}_1 ∨  b^{4, 279}_0 ∨ false 
c  in DIMACS:
-8390  8391  8392  0

c  3 does not represent an automaton state.
c    -(-b^{4, 279}_2 ∧  b^{4, 279}_1 ∧  b^{4, 279}_0 ∧ true) 
c  in CNF:
c     b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ false 
c  in DIMACS:
 8390 -8391 -8392  0
c  -3 does not represent an automaton state.
c    -( b^{4, 279}_2 ∧  b^{4, 279}_1 ∧  b^{4, 279}_0 ∧ true) 
c  in CNF:
c    -b^{4, 279}_2 ∨ -b^{4, 279}_1 ∨ -b^{4, 279}_0 ∨ false 
c  in DIMACS:
-8390 -8391 -8392  0

c i = 280
c  -2+1 --> -1
c    ( b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧  p_1120) -> ( b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0)
c  in CNF:
c    -b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨  b^{4, 281}_2
c    -b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_1
c    -b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨  b^{4, 281}_0
c  in DIMACS:
-8393 -8394  8395 -1120  8396 0
-8393 -8394  8395 -1120 -8397 0
-8393 -8394  8395 -1120  8398 0

c  -1+1 --> 0
c    ( b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0 ∧  p_1120) -> (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧ -b^{4, 281}_0)
c  in CNF:
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_2
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_1
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_0
c  in DIMACS:
-8393  8394 -8395 -1120 -8396 0
-8393  8394 -8395 -1120 -8397 0
-8393  8394 -8395 -1120 -8398 0

c  0+1 --> 1
c    (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧  p_1120) -> (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0)
c  in CNF:
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_2
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_1
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨  b^{4, 281}_0
c  in DIMACS:
 8393  8394  8395 -1120 -8396 0
 8393  8394  8395 -1120 -8397 0
 8393  8394  8395 -1120  8398 0

c  1+1 --> 2
c    (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0 ∧  p_1120) -> (-b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0)
c  in CNF:
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_2
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨  b^{4, 281}_1
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ -p_1120 ∨ -b^{4, 281}_0
c  in DIMACS:
 8393  8394 -8395 -1120 -8396 0
 8393  8394 -8395 -1120  8397 0
 8393  8394 -8395 -1120 -8398 0

c  2+1 --> break 
c    (-b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 8393 -8394  8395 -1120 1162 0


c  2-1 --> 1
c    (-b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧ -p_1120) -> (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0)
c  in CNF:
c     b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_2
c     b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_1
c     b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨  b^{4, 281}_0
c  in DIMACS:
 8393 -8394  8395  1120 -8396 0
 8393 -8394  8395  1120 -8397 0
 8393 -8394  8395  1120  8398 0

c  1-1 --> 0
c    (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0 ∧ -p_1120) -> (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧ -b^{4, 281}_0)
c  in CNF:
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_2
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_1
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_0
c  in DIMACS:
 8393  8394 -8395  1120 -8396 0
 8393  8394 -8395  1120 -8397 0
 8393  8394 -8395  1120 -8398 0

c  0-1 --> -1
c    (-b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧ -p_1120) -> ( b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0)
c  in CNF:
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨  b^{4, 281}_2
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_1
c     b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨  b^{4, 281}_0
c  in DIMACS:
 8393  8394  8395  1120  8396 0
 8393  8394  8395  1120 -8397 0
 8393  8394  8395  1120  8398 0

c  -1-1 --> -2
c    ( b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧  b^{4, 280}_0 ∧ -p_1120) -> ( b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0)
c  in CNF:
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨  b^{4, 281}_2
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨  b^{4, 281}_1
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨  p_1120 ∨ -b^{4, 281}_0
c  in DIMACS:
-8393  8394 -8395  1120  8396 0
-8393  8394 -8395  1120  8397 0
-8393  8394 -8395  1120 -8398 0

c  -2-1 --> break 
c    ( b^{4, 280}_2 ∧  b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨  b^{4, 280}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-8393 -8394  8395  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 280}_2 ∧ -b^{4, 280}_1 ∧ -b^{4, 280}_0 ∧ true) 
c  in CNF:
c    -b^{4, 280}_2 ∨  b^{4, 280}_1 ∨  b^{4, 280}_0 ∨ false 
c  in DIMACS:
-8393  8394  8395  0

c  3 does not represent an automaton state.
c    -(-b^{4, 280}_2 ∧  b^{4, 280}_1 ∧  b^{4, 280}_0 ∧ true) 
c  in CNF:
c     b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ false 
c  in DIMACS:
 8393 -8394 -8395  0
c  -3 does not represent an automaton state.
c    -( b^{4, 280}_2 ∧  b^{4, 280}_1 ∧  b^{4, 280}_0 ∧ true) 
c  in CNF:
c    -b^{4, 280}_2 ∨ -b^{4, 280}_1 ∨ -b^{4, 280}_0 ∨ false 
c  in DIMACS:
-8393 -8394 -8395  0

c i = 281
c  -2+1 --> -1
c    ( b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧  p_1124) -> ( b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0)
c  in CNF:
c    -b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨  b^{4, 282}_2
c    -b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_1
c    -b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨  b^{4, 282}_0
c  in DIMACS:
-8396 -8397  8398 -1124  8399 0
-8396 -8397  8398 -1124 -8400 0
-8396 -8397  8398 -1124  8401 0

c  -1+1 --> 0
c    ( b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0 ∧  p_1124) -> (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧ -b^{4, 282}_0)
c  in CNF:
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_2
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_1
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_0
c  in DIMACS:
-8396  8397 -8398 -1124 -8399 0
-8396  8397 -8398 -1124 -8400 0
-8396  8397 -8398 -1124 -8401 0

c  0+1 --> 1
c    (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧  p_1124) -> (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0)
c  in CNF:
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_2
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_1
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨  b^{4, 282}_0
c  in DIMACS:
 8396  8397  8398 -1124 -8399 0
 8396  8397  8398 -1124 -8400 0
 8396  8397  8398 -1124  8401 0

c  1+1 --> 2
c    (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0 ∧  p_1124) -> (-b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0)
c  in CNF:
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_2
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨  b^{4, 282}_1
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ -p_1124 ∨ -b^{4, 282}_0
c  in DIMACS:
 8396  8397 -8398 -1124 -8399 0
 8396  8397 -8398 -1124  8400 0
 8396  8397 -8398 -1124 -8401 0

c  2+1 --> break 
c    (-b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧  p_1124) -> break
c  in CNF:
c     b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ -p_1124 ∨ break
c  in DIMACS:
 8396 -8397  8398 -1124 1162 0


c  2-1 --> 1
c    (-b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧ -p_1124) -> (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0)
c  in CNF:
c     b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_2
c     b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_1
c     b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨  b^{4, 282}_0
c  in DIMACS:
 8396 -8397  8398  1124 -8399 0
 8396 -8397  8398  1124 -8400 0
 8396 -8397  8398  1124  8401 0

c  1-1 --> 0
c    (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0 ∧ -p_1124) -> (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧ -b^{4, 282}_0)
c  in CNF:
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_2
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_1
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_0
c  in DIMACS:
 8396  8397 -8398  1124 -8399 0
 8396  8397 -8398  1124 -8400 0
 8396  8397 -8398  1124 -8401 0

c  0-1 --> -1
c    (-b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧ -p_1124) -> ( b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0)
c  in CNF:
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨  b^{4, 282}_2
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_1
c     b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨  b^{4, 282}_0
c  in DIMACS:
 8396  8397  8398  1124  8399 0
 8396  8397  8398  1124 -8400 0
 8396  8397  8398  1124  8401 0

c  -1-1 --> -2
c    ( b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧  b^{4, 281}_0 ∧ -p_1124) -> ( b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0)
c  in CNF:
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨  b^{4, 282}_2
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨  b^{4, 282}_1
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨  p_1124 ∨ -b^{4, 282}_0
c  in DIMACS:
-8396  8397 -8398  1124  8399 0
-8396  8397 -8398  1124  8400 0
-8396  8397 -8398  1124 -8401 0

c  -2-1 --> break 
c    ( b^{4, 281}_2 ∧  b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧ -p_1124) -> break
c  in CNF:
c    -b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨  b^{4, 281}_0 ∨  p_1124 ∨ break
c  in DIMACS:
-8396 -8397  8398  1124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 281}_2 ∧ -b^{4, 281}_1 ∧ -b^{4, 281}_0 ∧ true) 
c  in CNF:
c    -b^{4, 281}_2 ∨  b^{4, 281}_1 ∨  b^{4, 281}_0 ∨ false 
c  in DIMACS:
-8396  8397  8398  0

c  3 does not represent an automaton state.
c    -(-b^{4, 281}_2 ∧  b^{4, 281}_1 ∧  b^{4, 281}_0 ∧ true) 
c  in CNF:
c     b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ false 
c  in DIMACS:
 8396 -8397 -8398  0
c  -3 does not represent an automaton state.
c    -( b^{4, 281}_2 ∧  b^{4, 281}_1 ∧  b^{4, 281}_0 ∧ true) 
c  in CNF:
c    -b^{4, 281}_2 ∨ -b^{4, 281}_1 ∨ -b^{4, 281}_0 ∨ false 
c  in DIMACS:
-8396 -8397 -8398  0

c i = 282
c  -2+1 --> -1
c    ( b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧  p_1128) -> ( b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0)
c  in CNF:
c    -b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨  b^{4, 283}_2
c    -b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_1
c    -b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨  b^{4, 283}_0
c  in DIMACS:
-8399 -8400  8401 -1128  8402 0
-8399 -8400  8401 -1128 -8403 0
-8399 -8400  8401 -1128  8404 0

c  -1+1 --> 0
c    ( b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0 ∧  p_1128) -> (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧ -b^{4, 283}_0)
c  in CNF:
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_2
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_1
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_0
c  in DIMACS:
-8399  8400 -8401 -1128 -8402 0
-8399  8400 -8401 -1128 -8403 0
-8399  8400 -8401 -1128 -8404 0

c  0+1 --> 1
c    (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧  p_1128) -> (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0)
c  in CNF:
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_2
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_1
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨  b^{4, 283}_0
c  in DIMACS:
 8399  8400  8401 -1128 -8402 0
 8399  8400  8401 -1128 -8403 0
 8399  8400  8401 -1128  8404 0

c  1+1 --> 2
c    (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0 ∧  p_1128) -> (-b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0)
c  in CNF:
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_2
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨  b^{4, 283}_1
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ -p_1128 ∨ -b^{4, 283}_0
c  in DIMACS:
 8399  8400 -8401 -1128 -8402 0
 8399  8400 -8401 -1128  8403 0
 8399  8400 -8401 -1128 -8404 0

c  2+1 --> break 
c    (-b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 8399 -8400  8401 -1128 1162 0


c  2-1 --> 1
c    (-b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧ -p_1128) -> (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0)
c  in CNF:
c     b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_2
c     b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_1
c     b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨  b^{4, 283}_0
c  in DIMACS:
 8399 -8400  8401  1128 -8402 0
 8399 -8400  8401  1128 -8403 0
 8399 -8400  8401  1128  8404 0

c  1-1 --> 0
c    (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0 ∧ -p_1128) -> (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧ -b^{4, 283}_0)
c  in CNF:
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_2
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_1
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_0
c  in DIMACS:
 8399  8400 -8401  1128 -8402 0
 8399  8400 -8401  1128 -8403 0
 8399  8400 -8401  1128 -8404 0

c  0-1 --> -1
c    (-b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧ -p_1128) -> ( b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0)
c  in CNF:
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨  b^{4, 283}_2
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_1
c     b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨  b^{4, 283}_0
c  in DIMACS:
 8399  8400  8401  1128  8402 0
 8399  8400  8401  1128 -8403 0
 8399  8400  8401  1128  8404 0

c  -1-1 --> -2
c    ( b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧  b^{4, 282}_0 ∧ -p_1128) -> ( b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0)
c  in CNF:
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨  b^{4, 283}_2
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨  b^{4, 283}_1
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨  p_1128 ∨ -b^{4, 283}_0
c  in DIMACS:
-8399  8400 -8401  1128  8402 0
-8399  8400 -8401  1128  8403 0
-8399  8400 -8401  1128 -8404 0

c  -2-1 --> break 
c    ( b^{4, 282}_2 ∧  b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨  b^{4, 282}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-8399 -8400  8401  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 282}_2 ∧ -b^{4, 282}_1 ∧ -b^{4, 282}_0 ∧ true) 
c  in CNF:
c    -b^{4, 282}_2 ∨  b^{4, 282}_1 ∨  b^{4, 282}_0 ∨ false 
c  in DIMACS:
-8399  8400  8401  0

c  3 does not represent an automaton state.
c    -(-b^{4, 282}_2 ∧  b^{4, 282}_1 ∧  b^{4, 282}_0 ∧ true) 
c  in CNF:
c     b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ false 
c  in DIMACS:
 8399 -8400 -8401  0
c  -3 does not represent an automaton state.
c    -( b^{4, 282}_2 ∧  b^{4, 282}_1 ∧  b^{4, 282}_0 ∧ true) 
c  in CNF:
c    -b^{4, 282}_2 ∨ -b^{4, 282}_1 ∨ -b^{4, 282}_0 ∨ false 
c  in DIMACS:
-8399 -8400 -8401  0

c i = 283
c  -2+1 --> -1
c    ( b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧  p_1132) -> ( b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0)
c  in CNF:
c    -b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨  b^{4, 284}_2
c    -b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_1
c    -b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨  b^{4, 284}_0
c  in DIMACS:
-8402 -8403  8404 -1132  8405 0
-8402 -8403  8404 -1132 -8406 0
-8402 -8403  8404 -1132  8407 0

c  -1+1 --> 0
c    ( b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0 ∧  p_1132) -> (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧ -b^{4, 284}_0)
c  in CNF:
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_2
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_1
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_0
c  in DIMACS:
-8402  8403 -8404 -1132 -8405 0
-8402  8403 -8404 -1132 -8406 0
-8402  8403 -8404 -1132 -8407 0

c  0+1 --> 1
c    (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧  p_1132) -> (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0)
c  in CNF:
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_2
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_1
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨  b^{4, 284}_0
c  in DIMACS:
 8402  8403  8404 -1132 -8405 0
 8402  8403  8404 -1132 -8406 0
 8402  8403  8404 -1132  8407 0

c  1+1 --> 2
c    (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0 ∧  p_1132) -> (-b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0)
c  in CNF:
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_2
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨  b^{4, 284}_1
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ -p_1132 ∨ -b^{4, 284}_0
c  in DIMACS:
 8402  8403 -8404 -1132 -8405 0
 8402  8403 -8404 -1132  8406 0
 8402  8403 -8404 -1132 -8407 0

c  2+1 --> break 
c    (-b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧  p_1132) -> break
c  in CNF:
c     b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ -p_1132 ∨ break
c  in DIMACS:
 8402 -8403  8404 -1132 1162 0


c  2-1 --> 1
c    (-b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧ -p_1132) -> (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0)
c  in CNF:
c     b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_2
c     b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_1
c     b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨  b^{4, 284}_0
c  in DIMACS:
 8402 -8403  8404  1132 -8405 0
 8402 -8403  8404  1132 -8406 0
 8402 -8403  8404  1132  8407 0

c  1-1 --> 0
c    (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0 ∧ -p_1132) -> (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧ -b^{4, 284}_0)
c  in CNF:
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_2
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_1
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_0
c  in DIMACS:
 8402  8403 -8404  1132 -8405 0
 8402  8403 -8404  1132 -8406 0
 8402  8403 -8404  1132 -8407 0

c  0-1 --> -1
c    (-b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧ -p_1132) -> ( b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0)
c  in CNF:
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨  b^{4, 284}_2
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_1
c     b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨  b^{4, 284}_0
c  in DIMACS:
 8402  8403  8404  1132  8405 0
 8402  8403  8404  1132 -8406 0
 8402  8403  8404  1132  8407 0

c  -1-1 --> -2
c    ( b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧  b^{4, 283}_0 ∧ -p_1132) -> ( b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0)
c  in CNF:
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨  b^{4, 284}_2
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨  b^{4, 284}_1
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨  p_1132 ∨ -b^{4, 284}_0
c  in DIMACS:
-8402  8403 -8404  1132  8405 0
-8402  8403 -8404  1132  8406 0
-8402  8403 -8404  1132 -8407 0

c  -2-1 --> break 
c    ( b^{4, 283}_2 ∧  b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧ -p_1132) -> break
c  in CNF:
c    -b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨  b^{4, 283}_0 ∨  p_1132 ∨ break
c  in DIMACS:
-8402 -8403  8404  1132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 283}_2 ∧ -b^{4, 283}_1 ∧ -b^{4, 283}_0 ∧ true) 
c  in CNF:
c    -b^{4, 283}_2 ∨  b^{4, 283}_1 ∨  b^{4, 283}_0 ∨ false 
c  in DIMACS:
-8402  8403  8404  0

c  3 does not represent an automaton state.
c    -(-b^{4, 283}_2 ∧  b^{4, 283}_1 ∧  b^{4, 283}_0 ∧ true) 
c  in CNF:
c     b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ false 
c  in DIMACS:
 8402 -8403 -8404  0
c  -3 does not represent an automaton state.
c    -( b^{4, 283}_2 ∧  b^{4, 283}_1 ∧  b^{4, 283}_0 ∧ true) 
c  in CNF:
c    -b^{4, 283}_2 ∨ -b^{4, 283}_1 ∨ -b^{4, 283}_0 ∨ false 
c  in DIMACS:
-8402 -8403 -8404  0

c i = 284
c  -2+1 --> -1
c    ( b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧  p_1136) -> ( b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0)
c  in CNF:
c    -b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨  b^{4, 285}_2
c    -b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_1
c    -b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨  b^{4, 285}_0
c  in DIMACS:
-8405 -8406  8407 -1136  8408 0
-8405 -8406  8407 -1136 -8409 0
-8405 -8406  8407 -1136  8410 0

c  -1+1 --> 0
c    ( b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0 ∧  p_1136) -> (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧ -b^{4, 285}_0)
c  in CNF:
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_2
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_1
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_0
c  in DIMACS:
-8405  8406 -8407 -1136 -8408 0
-8405  8406 -8407 -1136 -8409 0
-8405  8406 -8407 -1136 -8410 0

c  0+1 --> 1
c    (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧  p_1136) -> (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0)
c  in CNF:
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_2
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_1
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨  b^{4, 285}_0
c  in DIMACS:
 8405  8406  8407 -1136 -8408 0
 8405  8406  8407 -1136 -8409 0
 8405  8406  8407 -1136  8410 0

c  1+1 --> 2
c    (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0 ∧  p_1136) -> (-b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0)
c  in CNF:
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_2
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨  b^{4, 285}_1
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ -p_1136 ∨ -b^{4, 285}_0
c  in DIMACS:
 8405  8406 -8407 -1136 -8408 0
 8405  8406 -8407 -1136  8409 0
 8405  8406 -8407 -1136 -8410 0

c  2+1 --> break 
c    (-b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 8405 -8406  8407 -1136 1162 0


c  2-1 --> 1
c    (-b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧ -p_1136) -> (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0)
c  in CNF:
c     b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_2
c     b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_1
c     b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨  b^{4, 285}_0
c  in DIMACS:
 8405 -8406  8407  1136 -8408 0
 8405 -8406  8407  1136 -8409 0
 8405 -8406  8407  1136  8410 0

c  1-1 --> 0
c    (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0 ∧ -p_1136) -> (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧ -b^{4, 285}_0)
c  in CNF:
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_2
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_1
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_0
c  in DIMACS:
 8405  8406 -8407  1136 -8408 0
 8405  8406 -8407  1136 -8409 0
 8405  8406 -8407  1136 -8410 0

c  0-1 --> -1
c    (-b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧ -p_1136) -> ( b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0)
c  in CNF:
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨  b^{4, 285}_2
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_1
c     b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨  b^{4, 285}_0
c  in DIMACS:
 8405  8406  8407  1136  8408 0
 8405  8406  8407  1136 -8409 0
 8405  8406  8407  1136  8410 0

c  -1-1 --> -2
c    ( b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧  b^{4, 284}_0 ∧ -p_1136) -> ( b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0)
c  in CNF:
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨  b^{4, 285}_2
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨  b^{4, 285}_1
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨  p_1136 ∨ -b^{4, 285}_0
c  in DIMACS:
-8405  8406 -8407  1136  8408 0
-8405  8406 -8407  1136  8409 0
-8405  8406 -8407  1136 -8410 0

c  -2-1 --> break 
c    ( b^{4, 284}_2 ∧  b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨  b^{4, 284}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-8405 -8406  8407  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 284}_2 ∧ -b^{4, 284}_1 ∧ -b^{4, 284}_0 ∧ true) 
c  in CNF:
c    -b^{4, 284}_2 ∨  b^{4, 284}_1 ∨  b^{4, 284}_0 ∨ false 
c  in DIMACS:
-8405  8406  8407  0

c  3 does not represent an automaton state.
c    -(-b^{4, 284}_2 ∧  b^{4, 284}_1 ∧  b^{4, 284}_0 ∧ true) 
c  in CNF:
c     b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ false 
c  in DIMACS:
 8405 -8406 -8407  0
c  -3 does not represent an automaton state.
c    -( b^{4, 284}_2 ∧  b^{4, 284}_1 ∧  b^{4, 284}_0 ∧ true) 
c  in CNF:
c    -b^{4, 284}_2 ∨ -b^{4, 284}_1 ∨ -b^{4, 284}_0 ∨ false 
c  in DIMACS:
-8405 -8406 -8407  0

c i = 285
c  -2+1 --> -1
c    ( b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧  p_1140) -> ( b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0)
c  in CNF:
c    -b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨  b^{4, 286}_2
c    -b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_1
c    -b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨  b^{4, 286}_0
c  in DIMACS:
-8408 -8409  8410 -1140  8411 0
-8408 -8409  8410 -1140 -8412 0
-8408 -8409  8410 -1140  8413 0

c  -1+1 --> 0
c    ( b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0 ∧  p_1140) -> (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧ -b^{4, 286}_0)
c  in CNF:
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_2
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_1
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_0
c  in DIMACS:
-8408  8409 -8410 -1140 -8411 0
-8408  8409 -8410 -1140 -8412 0
-8408  8409 -8410 -1140 -8413 0

c  0+1 --> 1
c    (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧  p_1140) -> (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0)
c  in CNF:
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_2
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_1
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨  b^{4, 286}_0
c  in DIMACS:
 8408  8409  8410 -1140 -8411 0
 8408  8409  8410 -1140 -8412 0
 8408  8409  8410 -1140  8413 0

c  1+1 --> 2
c    (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0 ∧  p_1140) -> (-b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0)
c  in CNF:
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_2
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨  b^{4, 286}_1
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ -p_1140 ∨ -b^{4, 286}_0
c  in DIMACS:
 8408  8409 -8410 -1140 -8411 0
 8408  8409 -8410 -1140  8412 0
 8408  8409 -8410 -1140 -8413 0

c  2+1 --> break 
c    (-b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 8408 -8409  8410 -1140 1162 0


c  2-1 --> 1
c    (-b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧ -p_1140) -> (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0)
c  in CNF:
c     b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_2
c     b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_1
c     b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨  b^{4, 286}_0
c  in DIMACS:
 8408 -8409  8410  1140 -8411 0
 8408 -8409  8410  1140 -8412 0
 8408 -8409  8410  1140  8413 0

c  1-1 --> 0
c    (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0 ∧ -p_1140) -> (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧ -b^{4, 286}_0)
c  in CNF:
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_2
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_1
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_0
c  in DIMACS:
 8408  8409 -8410  1140 -8411 0
 8408  8409 -8410  1140 -8412 0
 8408  8409 -8410  1140 -8413 0

c  0-1 --> -1
c    (-b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧ -p_1140) -> ( b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0)
c  in CNF:
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨  b^{4, 286}_2
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_1
c     b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨  b^{4, 286}_0
c  in DIMACS:
 8408  8409  8410  1140  8411 0
 8408  8409  8410  1140 -8412 0
 8408  8409  8410  1140  8413 0

c  -1-1 --> -2
c    ( b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧  b^{4, 285}_0 ∧ -p_1140) -> ( b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0)
c  in CNF:
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨  b^{4, 286}_2
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨  b^{4, 286}_1
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨  p_1140 ∨ -b^{4, 286}_0
c  in DIMACS:
-8408  8409 -8410  1140  8411 0
-8408  8409 -8410  1140  8412 0
-8408  8409 -8410  1140 -8413 0

c  -2-1 --> break 
c    ( b^{4, 285}_2 ∧  b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨  b^{4, 285}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-8408 -8409  8410  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 285}_2 ∧ -b^{4, 285}_1 ∧ -b^{4, 285}_0 ∧ true) 
c  in CNF:
c    -b^{4, 285}_2 ∨  b^{4, 285}_1 ∨  b^{4, 285}_0 ∨ false 
c  in DIMACS:
-8408  8409  8410  0

c  3 does not represent an automaton state.
c    -(-b^{4, 285}_2 ∧  b^{4, 285}_1 ∧  b^{4, 285}_0 ∧ true) 
c  in CNF:
c     b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ false 
c  in DIMACS:
 8408 -8409 -8410  0
c  -3 does not represent an automaton state.
c    -( b^{4, 285}_2 ∧  b^{4, 285}_1 ∧  b^{4, 285}_0 ∧ true) 
c  in CNF:
c    -b^{4, 285}_2 ∨ -b^{4, 285}_1 ∨ -b^{4, 285}_0 ∨ false 
c  in DIMACS:
-8408 -8409 -8410  0

c i = 286
c  -2+1 --> -1
c    ( b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧  p_1144) -> ( b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0)
c  in CNF:
c    -b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨  b^{4, 287}_2
c    -b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_1
c    -b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨  b^{4, 287}_0
c  in DIMACS:
-8411 -8412  8413 -1144  8414 0
-8411 -8412  8413 -1144 -8415 0
-8411 -8412  8413 -1144  8416 0

c  -1+1 --> 0
c    ( b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0 ∧  p_1144) -> (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧ -b^{4, 287}_0)
c  in CNF:
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_2
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_1
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_0
c  in DIMACS:
-8411  8412 -8413 -1144 -8414 0
-8411  8412 -8413 -1144 -8415 0
-8411  8412 -8413 -1144 -8416 0

c  0+1 --> 1
c    (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧  p_1144) -> (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0)
c  in CNF:
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_2
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_1
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨  b^{4, 287}_0
c  in DIMACS:
 8411  8412  8413 -1144 -8414 0
 8411  8412  8413 -1144 -8415 0
 8411  8412  8413 -1144  8416 0

c  1+1 --> 2
c    (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0 ∧  p_1144) -> (-b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0)
c  in CNF:
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_2
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨  b^{4, 287}_1
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ -p_1144 ∨ -b^{4, 287}_0
c  in DIMACS:
 8411  8412 -8413 -1144 -8414 0
 8411  8412 -8413 -1144  8415 0
 8411  8412 -8413 -1144 -8416 0

c  2+1 --> break 
c    (-b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 8411 -8412  8413 -1144 1162 0


c  2-1 --> 1
c    (-b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧ -p_1144) -> (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0)
c  in CNF:
c     b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_2
c     b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_1
c     b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨  b^{4, 287}_0
c  in DIMACS:
 8411 -8412  8413  1144 -8414 0
 8411 -8412  8413  1144 -8415 0
 8411 -8412  8413  1144  8416 0

c  1-1 --> 0
c    (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0 ∧ -p_1144) -> (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧ -b^{4, 287}_0)
c  in CNF:
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_2
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_1
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_0
c  in DIMACS:
 8411  8412 -8413  1144 -8414 0
 8411  8412 -8413  1144 -8415 0
 8411  8412 -8413  1144 -8416 0

c  0-1 --> -1
c    (-b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧ -p_1144) -> ( b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0)
c  in CNF:
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨  b^{4, 287}_2
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_1
c     b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨  b^{4, 287}_0
c  in DIMACS:
 8411  8412  8413  1144  8414 0
 8411  8412  8413  1144 -8415 0
 8411  8412  8413  1144  8416 0

c  -1-1 --> -2
c    ( b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧  b^{4, 286}_0 ∧ -p_1144) -> ( b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0)
c  in CNF:
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨  b^{4, 287}_2
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨  b^{4, 287}_1
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨  p_1144 ∨ -b^{4, 287}_0
c  in DIMACS:
-8411  8412 -8413  1144  8414 0
-8411  8412 -8413  1144  8415 0
-8411  8412 -8413  1144 -8416 0

c  -2-1 --> break 
c    ( b^{4, 286}_2 ∧  b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨  b^{4, 286}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-8411 -8412  8413  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 286}_2 ∧ -b^{4, 286}_1 ∧ -b^{4, 286}_0 ∧ true) 
c  in CNF:
c    -b^{4, 286}_2 ∨  b^{4, 286}_1 ∨  b^{4, 286}_0 ∨ false 
c  in DIMACS:
-8411  8412  8413  0

c  3 does not represent an automaton state.
c    -(-b^{4, 286}_2 ∧  b^{4, 286}_1 ∧  b^{4, 286}_0 ∧ true) 
c  in CNF:
c     b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ false 
c  in DIMACS:
 8411 -8412 -8413  0
c  -3 does not represent an automaton state.
c    -( b^{4, 286}_2 ∧  b^{4, 286}_1 ∧  b^{4, 286}_0 ∧ true) 
c  in CNF:
c    -b^{4, 286}_2 ∨ -b^{4, 286}_1 ∨ -b^{4, 286}_0 ∨ false 
c  in DIMACS:
-8411 -8412 -8413  0

c i = 287
c  -2+1 --> -1
c    ( b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧  p_1148) -> ( b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0)
c  in CNF:
c    -b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨  b^{4, 288}_2
c    -b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_1
c    -b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨  b^{4, 288}_0
c  in DIMACS:
-8414 -8415  8416 -1148  8417 0
-8414 -8415  8416 -1148 -8418 0
-8414 -8415  8416 -1148  8419 0

c  -1+1 --> 0
c    ( b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0 ∧  p_1148) -> (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧ -b^{4, 288}_0)
c  in CNF:
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_2
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_1
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_0
c  in DIMACS:
-8414  8415 -8416 -1148 -8417 0
-8414  8415 -8416 -1148 -8418 0
-8414  8415 -8416 -1148 -8419 0

c  0+1 --> 1
c    (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧  p_1148) -> (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0)
c  in CNF:
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_2
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_1
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨  b^{4, 288}_0
c  in DIMACS:
 8414  8415  8416 -1148 -8417 0
 8414  8415  8416 -1148 -8418 0
 8414  8415  8416 -1148  8419 0

c  1+1 --> 2
c    (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0 ∧  p_1148) -> (-b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0)
c  in CNF:
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_2
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨  b^{4, 288}_1
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ -p_1148 ∨ -b^{4, 288}_0
c  in DIMACS:
 8414  8415 -8416 -1148 -8417 0
 8414  8415 -8416 -1148  8418 0
 8414  8415 -8416 -1148 -8419 0

c  2+1 --> break 
c    (-b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 8414 -8415  8416 -1148 1162 0


c  2-1 --> 1
c    (-b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧ -p_1148) -> (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0)
c  in CNF:
c     b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_2
c     b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_1
c     b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨  b^{4, 288}_0
c  in DIMACS:
 8414 -8415  8416  1148 -8417 0
 8414 -8415  8416  1148 -8418 0
 8414 -8415  8416  1148  8419 0

c  1-1 --> 0
c    (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0 ∧ -p_1148) -> (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧ -b^{4, 288}_0)
c  in CNF:
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_2
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_1
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_0
c  in DIMACS:
 8414  8415 -8416  1148 -8417 0
 8414  8415 -8416  1148 -8418 0
 8414  8415 -8416  1148 -8419 0

c  0-1 --> -1
c    (-b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧ -p_1148) -> ( b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0)
c  in CNF:
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨  b^{4, 288}_2
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_1
c     b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨  b^{4, 288}_0
c  in DIMACS:
 8414  8415  8416  1148  8417 0
 8414  8415  8416  1148 -8418 0
 8414  8415  8416  1148  8419 0

c  -1-1 --> -2
c    ( b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧  b^{4, 287}_0 ∧ -p_1148) -> ( b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0)
c  in CNF:
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨  b^{4, 288}_2
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨  b^{4, 288}_1
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨  p_1148 ∨ -b^{4, 288}_0
c  in DIMACS:
-8414  8415 -8416  1148  8417 0
-8414  8415 -8416  1148  8418 0
-8414  8415 -8416  1148 -8419 0

c  -2-1 --> break 
c    ( b^{4, 287}_2 ∧  b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨  b^{4, 287}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-8414 -8415  8416  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 287}_2 ∧ -b^{4, 287}_1 ∧ -b^{4, 287}_0 ∧ true) 
c  in CNF:
c    -b^{4, 287}_2 ∨  b^{4, 287}_1 ∨  b^{4, 287}_0 ∨ false 
c  in DIMACS:
-8414  8415  8416  0

c  3 does not represent an automaton state.
c    -(-b^{4, 287}_2 ∧  b^{4, 287}_1 ∧  b^{4, 287}_0 ∧ true) 
c  in CNF:
c     b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ false 
c  in DIMACS:
 8414 -8415 -8416  0
c  -3 does not represent an automaton state.
c    -( b^{4, 287}_2 ∧  b^{4, 287}_1 ∧  b^{4, 287}_0 ∧ true) 
c  in CNF:
c    -b^{4, 287}_2 ∨ -b^{4, 287}_1 ∨ -b^{4, 287}_0 ∨ false 
c  in DIMACS:
-8414 -8415 -8416  0

c i = 288
c  -2+1 --> -1
c    ( b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧  p_1152) -> ( b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0)
c  in CNF:
c    -b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨  b^{4, 289}_2
c    -b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_1
c    -b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨  b^{4, 289}_0
c  in DIMACS:
-8417 -8418  8419 -1152  8420 0
-8417 -8418  8419 -1152 -8421 0
-8417 -8418  8419 -1152  8422 0

c  -1+1 --> 0
c    ( b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0 ∧  p_1152) -> (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧ -b^{4, 289}_0)
c  in CNF:
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_2
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_1
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_0
c  in DIMACS:
-8417  8418 -8419 -1152 -8420 0
-8417  8418 -8419 -1152 -8421 0
-8417  8418 -8419 -1152 -8422 0

c  0+1 --> 1
c    (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧  p_1152) -> (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0)
c  in CNF:
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_2
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_1
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨  b^{4, 289}_0
c  in DIMACS:
 8417  8418  8419 -1152 -8420 0
 8417  8418  8419 -1152 -8421 0
 8417  8418  8419 -1152  8422 0

c  1+1 --> 2
c    (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0 ∧  p_1152) -> (-b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0)
c  in CNF:
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_2
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨  b^{4, 289}_1
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ -p_1152 ∨ -b^{4, 289}_0
c  in DIMACS:
 8417  8418 -8419 -1152 -8420 0
 8417  8418 -8419 -1152  8421 0
 8417  8418 -8419 -1152 -8422 0

c  2+1 --> break 
c    (-b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 8417 -8418  8419 -1152 1162 0


c  2-1 --> 1
c    (-b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧ -p_1152) -> (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0)
c  in CNF:
c     b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_2
c     b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_1
c     b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨  b^{4, 289}_0
c  in DIMACS:
 8417 -8418  8419  1152 -8420 0
 8417 -8418  8419  1152 -8421 0
 8417 -8418  8419  1152  8422 0

c  1-1 --> 0
c    (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0 ∧ -p_1152) -> (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧ -b^{4, 289}_0)
c  in CNF:
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_2
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_1
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_0
c  in DIMACS:
 8417  8418 -8419  1152 -8420 0
 8417  8418 -8419  1152 -8421 0
 8417  8418 -8419  1152 -8422 0

c  0-1 --> -1
c    (-b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧ -p_1152) -> ( b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0)
c  in CNF:
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨  b^{4, 289}_2
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_1
c     b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨  b^{4, 289}_0
c  in DIMACS:
 8417  8418  8419  1152  8420 0
 8417  8418  8419  1152 -8421 0
 8417  8418  8419  1152  8422 0

c  -1-1 --> -2
c    ( b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧  b^{4, 288}_0 ∧ -p_1152) -> ( b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0)
c  in CNF:
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨  b^{4, 289}_2
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨  b^{4, 289}_1
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨  p_1152 ∨ -b^{4, 289}_0
c  in DIMACS:
-8417  8418 -8419  1152  8420 0
-8417  8418 -8419  1152  8421 0
-8417  8418 -8419  1152 -8422 0

c  -2-1 --> break 
c    ( b^{4, 288}_2 ∧  b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨  b^{4, 288}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-8417 -8418  8419  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 288}_2 ∧ -b^{4, 288}_1 ∧ -b^{4, 288}_0 ∧ true) 
c  in CNF:
c    -b^{4, 288}_2 ∨  b^{4, 288}_1 ∨  b^{4, 288}_0 ∨ false 
c  in DIMACS:
-8417  8418  8419  0

c  3 does not represent an automaton state.
c    -(-b^{4, 288}_2 ∧  b^{4, 288}_1 ∧  b^{4, 288}_0 ∧ true) 
c  in CNF:
c     b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ false 
c  in DIMACS:
 8417 -8418 -8419  0
c  -3 does not represent an automaton state.
c    -( b^{4, 288}_2 ∧  b^{4, 288}_1 ∧  b^{4, 288}_0 ∧ true) 
c  in CNF:
c    -b^{4, 288}_2 ∨ -b^{4, 288}_1 ∨ -b^{4, 288}_0 ∨ false 
c  in DIMACS:
-8417 -8418 -8419  0

c i = 289
c  -2+1 --> -1
c    ( b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧  p_1156) -> ( b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0)
c  in CNF:
c    -b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨  b^{4, 290}_2
c    -b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_1
c    -b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨  b^{4, 290}_0
c  in DIMACS:
-8420 -8421  8422 -1156  8423 0
-8420 -8421  8422 -1156 -8424 0
-8420 -8421  8422 -1156  8425 0

c  -1+1 --> 0
c    ( b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0 ∧  p_1156) -> (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧ -b^{4, 290}_0)
c  in CNF:
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_2
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_1
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_0
c  in DIMACS:
-8420  8421 -8422 -1156 -8423 0
-8420  8421 -8422 -1156 -8424 0
-8420  8421 -8422 -1156 -8425 0

c  0+1 --> 1
c    (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧  p_1156) -> (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0)
c  in CNF:
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_2
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_1
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨  b^{4, 290}_0
c  in DIMACS:
 8420  8421  8422 -1156 -8423 0
 8420  8421  8422 -1156 -8424 0
 8420  8421  8422 -1156  8425 0

c  1+1 --> 2
c    (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0 ∧  p_1156) -> (-b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0)
c  in CNF:
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_2
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨  b^{4, 290}_1
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ -p_1156 ∨ -b^{4, 290}_0
c  in DIMACS:
 8420  8421 -8422 -1156 -8423 0
 8420  8421 -8422 -1156  8424 0
 8420  8421 -8422 -1156 -8425 0

c  2+1 --> break 
c    (-b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 8420 -8421  8422 -1156 1162 0


c  2-1 --> 1
c    (-b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧ -p_1156) -> (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0)
c  in CNF:
c     b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_2
c     b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_1
c     b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨  b^{4, 290}_0
c  in DIMACS:
 8420 -8421  8422  1156 -8423 0
 8420 -8421  8422  1156 -8424 0
 8420 -8421  8422  1156  8425 0

c  1-1 --> 0
c    (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0 ∧ -p_1156) -> (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧ -b^{4, 290}_0)
c  in CNF:
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_2
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_1
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_0
c  in DIMACS:
 8420  8421 -8422  1156 -8423 0
 8420  8421 -8422  1156 -8424 0
 8420  8421 -8422  1156 -8425 0

c  0-1 --> -1
c    (-b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧ -p_1156) -> ( b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0)
c  in CNF:
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨  b^{4, 290}_2
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_1
c     b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨  b^{4, 290}_0
c  in DIMACS:
 8420  8421  8422  1156  8423 0
 8420  8421  8422  1156 -8424 0
 8420  8421  8422  1156  8425 0

c  -1-1 --> -2
c    ( b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧  b^{4, 289}_0 ∧ -p_1156) -> ( b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0)
c  in CNF:
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨  b^{4, 290}_2
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨  b^{4, 290}_1
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨  p_1156 ∨ -b^{4, 290}_0
c  in DIMACS:
-8420  8421 -8422  1156  8423 0
-8420  8421 -8422  1156  8424 0
-8420  8421 -8422  1156 -8425 0

c  -2-1 --> break 
c    ( b^{4, 289}_2 ∧  b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨  b^{4, 289}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-8420 -8421  8422  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 289}_2 ∧ -b^{4, 289}_1 ∧ -b^{4, 289}_0 ∧ true) 
c  in CNF:
c    -b^{4, 289}_2 ∨  b^{4, 289}_1 ∨  b^{4, 289}_0 ∨ false 
c  in DIMACS:
-8420  8421  8422  0

c  3 does not represent an automaton state.
c    -(-b^{4, 289}_2 ∧  b^{4, 289}_1 ∧  b^{4, 289}_0 ∧ true) 
c  in CNF:
c     b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ false 
c  in DIMACS:
 8420 -8421 -8422  0
c  -3 does not represent an automaton state.
c    -( b^{4, 289}_2 ∧  b^{4, 289}_1 ∧  b^{4, 289}_0 ∧ true) 
c  in CNF:
c    -b^{4, 289}_2 ∨ -b^{4, 289}_1 ∨ -b^{4, 289}_0 ∨ false 
c  in DIMACS:
-8420 -8421 -8422  0

c i = 290
c  -2+1 --> -1
c    ( b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧  p_1160) -> ( b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧  b^{4, 291}_0)
c  in CNF:
c    -b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨  b^{4, 291}_2
c    -b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_1
c    -b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨  b^{4, 291}_0
c  in DIMACS:
-8423 -8424  8425 -1160  8426 0
-8423 -8424  8425 -1160 -8427 0
-8423 -8424  8425 -1160  8428 0

c  -1+1 --> 0
c    ( b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0 ∧  p_1160) -> (-b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧ -b^{4, 291}_0)
c  in CNF:
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_2
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_1
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_0
c  in DIMACS:
-8423  8424 -8425 -1160 -8426 0
-8423  8424 -8425 -1160 -8427 0
-8423  8424 -8425 -1160 -8428 0

c  0+1 --> 1
c    (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧  p_1160) -> (-b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧  b^{4, 291}_0)
c  in CNF:
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_2
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_1
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨  b^{4, 291}_0
c  in DIMACS:
 8423  8424  8425 -1160 -8426 0
 8423  8424  8425 -1160 -8427 0
 8423  8424  8425 -1160  8428 0

c  1+1 --> 2
c    (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0 ∧  p_1160) -> (-b^{4, 291}_2 ∧  b^{4, 291}_1 ∧ -b^{4, 291}_0)
c  in CNF:
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_2
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨  b^{4, 291}_1
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ -p_1160 ∨ -b^{4, 291}_0
c  in DIMACS:
 8423  8424 -8425 -1160 -8426 0
 8423  8424 -8425 -1160  8427 0
 8423  8424 -8425 -1160 -8428 0

c  2+1 --> break 
c    (-b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 8423 -8424  8425 -1160 1162 0


c  2-1 --> 1
c    (-b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧ -p_1160) -> (-b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧  b^{4, 291}_0)
c  in CNF:
c     b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_2
c     b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_1
c     b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨  b^{4, 291}_0
c  in DIMACS:
 8423 -8424  8425  1160 -8426 0
 8423 -8424  8425  1160 -8427 0
 8423 -8424  8425  1160  8428 0

c  1-1 --> 0
c    (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0 ∧ -p_1160) -> (-b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧ -b^{4, 291}_0)
c  in CNF:
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_2
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_1
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_0
c  in DIMACS:
 8423  8424 -8425  1160 -8426 0
 8423  8424 -8425  1160 -8427 0
 8423  8424 -8425  1160 -8428 0

c  0-1 --> -1
c    (-b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧ -p_1160) -> ( b^{4, 291}_2 ∧ -b^{4, 291}_1 ∧  b^{4, 291}_0)
c  in CNF:
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨  b^{4, 291}_2
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_1
c     b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨  b^{4, 291}_0
c  in DIMACS:
 8423  8424  8425  1160  8426 0
 8423  8424  8425  1160 -8427 0
 8423  8424  8425  1160  8428 0

c  -1-1 --> -2
c    ( b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧  b^{4, 290}_0 ∧ -p_1160) -> ( b^{4, 291}_2 ∧  b^{4, 291}_1 ∧ -b^{4, 291}_0)
c  in CNF:
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨  b^{4, 291}_2
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨  b^{4, 291}_1
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨  p_1160 ∨ -b^{4, 291}_0
c  in DIMACS:
-8423  8424 -8425  1160  8426 0
-8423  8424 -8425  1160  8427 0
-8423  8424 -8425  1160 -8428 0

c  -2-1 --> break 
c    ( b^{4, 290}_2 ∧  b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨  b^{4, 290}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-8423 -8424  8425  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{4, 290}_2 ∧ -b^{4, 290}_1 ∧ -b^{4, 290}_0 ∧ true) 
c  in CNF:
c    -b^{4, 290}_2 ∨  b^{4, 290}_1 ∨  b^{4, 290}_0 ∨ false 
c  in DIMACS:
-8423  8424  8425  0

c  3 does not represent an automaton state.
c    -(-b^{4, 290}_2 ∧  b^{4, 290}_1 ∧  b^{4, 290}_0 ∧ true) 
c  in CNF:
c     b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ false 
c  in DIMACS:
 8423 -8424 -8425  0
c  -3 does not represent an automaton state.
c    -( b^{4, 290}_2 ∧  b^{4, 290}_1 ∧  b^{4, 290}_0 ∧ true) 
c  in CNF:
c    -b^{4, 290}_2 ∨ -b^{4, 290}_1 ∨ -b^{4, 290}_0 ∨ false 
c  in DIMACS:
-8423 -8424 -8425  0

c INIT for k = 5
c    -b^{5, 1}_2
c    -b^{5, 1}_1
c    -b^{5, 1}_0
c  in DIMACS:
-8429 0
-8430 0
-8431 0

c Transitions for k = 5
c i = 1
c  -2+1 --> -1
c    ( b^{5, 1}_2 ∧  b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧  p_5) -> ( b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0)
c  in CNF:
c    -b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨  b^{5, 2}_2
c    -b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_1
c    -b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨  b^{5, 2}_0
c  in DIMACS:
-8429 -8430  8431 -5  8432 0
-8429 -8430  8431 -5 -8433 0
-8429 -8430  8431 -5  8434 0

c  -1+1 --> 0
c    ( b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧  b^{5, 1}_0 ∧  p_5) -> (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧ -b^{5, 2}_0)
c  in CNF:
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_2
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_1
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_0
c  in DIMACS:
-8429  8430 -8431 -5 -8432 0
-8429  8430 -8431 -5 -8433 0
-8429  8430 -8431 -5 -8434 0

c  0+1 --> 1
c    (-b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧  p_5) -> (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0)
c  in CNF:
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_2
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_1
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨  b^{5, 2}_0
c  in DIMACS:
 8429  8430  8431 -5 -8432 0
 8429  8430  8431 -5 -8433 0
 8429  8430  8431 -5  8434 0

c  1+1 --> 2
c    (-b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧  b^{5, 1}_0 ∧  p_5) -> (-b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0)
c  in CNF:
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_2
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨  b^{5, 2}_1
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ -p_5 ∨ -b^{5, 2}_0
c  in DIMACS:
 8429  8430 -8431 -5 -8432 0
 8429  8430 -8431 -5  8433 0
 8429  8430 -8431 -5 -8434 0

c  2+1 --> break 
c    (-b^{5, 1}_2 ∧  b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧  p_5) -> break
c  in CNF:
c     b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ -p_5 ∨ break
c  in DIMACS:
 8429 -8430  8431 -5 1162 0


c  2-1 --> 1
c    (-b^{5, 1}_2 ∧  b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧ -p_5) -> (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0)
c  in CNF:
c     b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_2
c     b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_1
c     b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨  b^{5, 2}_0
c  in DIMACS:
 8429 -8430  8431  5 -8432 0
 8429 -8430  8431  5 -8433 0
 8429 -8430  8431  5  8434 0

c  1-1 --> 0
c    (-b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧  b^{5, 1}_0 ∧ -p_5) -> (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧ -b^{5, 2}_0)
c  in CNF:
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_2
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_1
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_0
c  in DIMACS:
 8429  8430 -8431  5 -8432 0
 8429  8430 -8431  5 -8433 0
 8429  8430 -8431  5 -8434 0

c  0-1 --> -1
c    (-b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧ -p_5) -> ( b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0)
c  in CNF:
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨  b^{5, 2}_2
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_1
c     b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨  b^{5, 2}_0
c  in DIMACS:
 8429  8430  8431  5  8432 0
 8429  8430  8431  5 -8433 0
 8429  8430  8431  5  8434 0

c  -1-1 --> -2
c    ( b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧  b^{5, 1}_0 ∧ -p_5) -> ( b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0)
c  in CNF:
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨  b^{5, 2}_2
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨  b^{5, 2}_1
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨  p_5 ∨ -b^{5, 2}_0
c  in DIMACS:
-8429  8430 -8431  5  8432 0
-8429  8430 -8431  5  8433 0
-8429  8430 -8431  5 -8434 0

c  -2-1 --> break 
c    ( b^{5, 1}_2 ∧  b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧ -p_5) -> break
c  in CNF:
c    -b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨  b^{5, 1}_0 ∨  p_5 ∨ break
c  in DIMACS:
-8429 -8430  8431  5 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 1}_2 ∧ -b^{5, 1}_1 ∧ -b^{5, 1}_0 ∧ true) 
c  in CNF:
c    -b^{5, 1}_2 ∨  b^{5, 1}_1 ∨  b^{5, 1}_0 ∨ false 
c  in DIMACS:
-8429  8430  8431  0

c  3 does not represent an automaton state.
c    -(-b^{5, 1}_2 ∧  b^{5, 1}_1 ∧  b^{5, 1}_0 ∧ true) 
c  in CNF:
c     b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ false 
c  in DIMACS:
 8429 -8430 -8431  0
c  -3 does not represent an automaton state.
c    -( b^{5, 1}_2 ∧  b^{5, 1}_1 ∧  b^{5, 1}_0 ∧ true) 
c  in CNF:
c    -b^{5, 1}_2 ∨ -b^{5, 1}_1 ∨ -b^{5, 1}_0 ∨ false 
c  in DIMACS:
-8429 -8430 -8431  0

c i = 2
c  -2+1 --> -1
c    ( b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧  p_10) -> ( b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0)
c  in CNF:
c    -b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨  b^{5, 3}_2
c    -b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_1
c    -b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨  b^{5, 3}_0
c  in DIMACS:
-8432 -8433  8434 -10  8435 0
-8432 -8433  8434 -10 -8436 0
-8432 -8433  8434 -10  8437 0

c  -1+1 --> 0
c    ( b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0 ∧  p_10) -> (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧ -b^{5, 3}_0)
c  in CNF:
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_2
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_1
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_0
c  in DIMACS:
-8432  8433 -8434 -10 -8435 0
-8432  8433 -8434 -10 -8436 0
-8432  8433 -8434 -10 -8437 0

c  0+1 --> 1
c    (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧  p_10) -> (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0)
c  in CNF:
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_2
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_1
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨  b^{5, 3}_0
c  in DIMACS:
 8432  8433  8434 -10 -8435 0
 8432  8433  8434 -10 -8436 0
 8432  8433  8434 -10  8437 0

c  1+1 --> 2
c    (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0 ∧  p_10) -> (-b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0)
c  in CNF:
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_2
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨  b^{5, 3}_1
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ -p_10 ∨ -b^{5, 3}_0
c  in DIMACS:
 8432  8433 -8434 -10 -8435 0
 8432  8433 -8434 -10  8436 0
 8432  8433 -8434 -10 -8437 0

c  2+1 --> break 
c    (-b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧  p_10) -> break
c  in CNF:
c     b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ -p_10 ∨ break
c  in DIMACS:
 8432 -8433  8434 -10 1162 0


c  2-1 --> 1
c    (-b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧ -p_10) -> (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0)
c  in CNF:
c     b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_2
c     b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_1
c     b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨  b^{5, 3}_0
c  in DIMACS:
 8432 -8433  8434  10 -8435 0
 8432 -8433  8434  10 -8436 0
 8432 -8433  8434  10  8437 0

c  1-1 --> 0
c    (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0 ∧ -p_10) -> (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧ -b^{5, 3}_0)
c  in CNF:
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_2
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_1
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_0
c  in DIMACS:
 8432  8433 -8434  10 -8435 0
 8432  8433 -8434  10 -8436 0
 8432  8433 -8434  10 -8437 0

c  0-1 --> -1
c    (-b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧ -p_10) -> ( b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0)
c  in CNF:
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨  b^{5, 3}_2
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_1
c     b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨  b^{5, 3}_0
c  in DIMACS:
 8432  8433  8434  10  8435 0
 8432  8433  8434  10 -8436 0
 8432  8433  8434  10  8437 0

c  -1-1 --> -2
c    ( b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧  b^{5, 2}_0 ∧ -p_10) -> ( b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0)
c  in CNF:
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨  b^{5, 3}_2
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨  b^{5, 3}_1
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨  p_10 ∨ -b^{5, 3}_0
c  in DIMACS:
-8432  8433 -8434  10  8435 0
-8432  8433 -8434  10  8436 0
-8432  8433 -8434  10 -8437 0

c  -2-1 --> break 
c    ( b^{5, 2}_2 ∧  b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧ -p_10) -> break
c  in CNF:
c    -b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨  b^{5, 2}_0 ∨  p_10 ∨ break
c  in DIMACS:
-8432 -8433  8434  10 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 2}_2 ∧ -b^{5, 2}_1 ∧ -b^{5, 2}_0 ∧ true) 
c  in CNF:
c    -b^{5, 2}_2 ∨  b^{5, 2}_1 ∨  b^{5, 2}_0 ∨ false 
c  in DIMACS:
-8432  8433  8434  0

c  3 does not represent an automaton state.
c    -(-b^{5, 2}_2 ∧  b^{5, 2}_1 ∧  b^{5, 2}_0 ∧ true) 
c  in CNF:
c     b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ false 
c  in DIMACS:
 8432 -8433 -8434  0
c  -3 does not represent an automaton state.
c    -( b^{5, 2}_2 ∧  b^{5, 2}_1 ∧  b^{5, 2}_0 ∧ true) 
c  in CNF:
c    -b^{5, 2}_2 ∨ -b^{5, 2}_1 ∨ -b^{5, 2}_0 ∨ false 
c  in DIMACS:
-8432 -8433 -8434  0

c i = 3
c  -2+1 --> -1
c    ( b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧  p_15) -> ( b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0)
c  in CNF:
c    -b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨  b^{5, 4}_2
c    -b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_1
c    -b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨  b^{5, 4}_0
c  in DIMACS:
-8435 -8436  8437 -15  8438 0
-8435 -8436  8437 -15 -8439 0
-8435 -8436  8437 -15  8440 0

c  -1+1 --> 0
c    ( b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0 ∧  p_15) -> (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧ -b^{5, 4}_0)
c  in CNF:
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_2
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_1
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_0
c  in DIMACS:
-8435  8436 -8437 -15 -8438 0
-8435  8436 -8437 -15 -8439 0
-8435  8436 -8437 -15 -8440 0

c  0+1 --> 1
c    (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧  p_15) -> (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0)
c  in CNF:
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_2
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_1
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨  b^{5, 4}_0
c  in DIMACS:
 8435  8436  8437 -15 -8438 0
 8435  8436  8437 -15 -8439 0
 8435  8436  8437 -15  8440 0

c  1+1 --> 2
c    (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0 ∧  p_15) -> (-b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0)
c  in CNF:
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_2
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨  b^{5, 4}_1
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ -p_15 ∨ -b^{5, 4}_0
c  in DIMACS:
 8435  8436 -8437 -15 -8438 0
 8435  8436 -8437 -15  8439 0
 8435  8436 -8437 -15 -8440 0

c  2+1 --> break 
c    (-b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧  p_15) -> break
c  in CNF:
c     b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ -p_15 ∨ break
c  in DIMACS:
 8435 -8436  8437 -15 1162 0


c  2-1 --> 1
c    (-b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧ -p_15) -> (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0)
c  in CNF:
c     b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_2
c     b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_1
c     b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨  b^{5, 4}_0
c  in DIMACS:
 8435 -8436  8437  15 -8438 0
 8435 -8436  8437  15 -8439 0
 8435 -8436  8437  15  8440 0

c  1-1 --> 0
c    (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0 ∧ -p_15) -> (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧ -b^{5, 4}_0)
c  in CNF:
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_2
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_1
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_0
c  in DIMACS:
 8435  8436 -8437  15 -8438 0
 8435  8436 -8437  15 -8439 0
 8435  8436 -8437  15 -8440 0

c  0-1 --> -1
c    (-b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧ -p_15) -> ( b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0)
c  in CNF:
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨  b^{5, 4}_2
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_1
c     b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨  b^{5, 4}_0
c  in DIMACS:
 8435  8436  8437  15  8438 0
 8435  8436  8437  15 -8439 0
 8435  8436  8437  15  8440 0

c  -1-1 --> -2
c    ( b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧  b^{5, 3}_0 ∧ -p_15) -> ( b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0)
c  in CNF:
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨  b^{5, 4}_2
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨  b^{5, 4}_1
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨  p_15 ∨ -b^{5, 4}_0
c  in DIMACS:
-8435  8436 -8437  15  8438 0
-8435  8436 -8437  15  8439 0
-8435  8436 -8437  15 -8440 0

c  -2-1 --> break 
c    ( b^{5, 3}_2 ∧  b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧ -p_15) -> break
c  in CNF:
c    -b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨  b^{5, 3}_0 ∨  p_15 ∨ break
c  in DIMACS:
-8435 -8436  8437  15 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 3}_2 ∧ -b^{5, 3}_1 ∧ -b^{5, 3}_0 ∧ true) 
c  in CNF:
c    -b^{5, 3}_2 ∨  b^{5, 3}_1 ∨  b^{5, 3}_0 ∨ false 
c  in DIMACS:
-8435  8436  8437  0

c  3 does not represent an automaton state.
c    -(-b^{5, 3}_2 ∧  b^{5, 3}_1 ∧  b^{5, 3}_0 ∧ true) 
c  in CNF:
c     b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ false 
c  in DIMACS:
 8435 -8436 -8437  0
c  -3 does not represent an automaton state.
c    -( b^{5, 3}_2 ∧  b^{5, 3}_1 ∧  b^{5, 3}_0 ∧ true) 
c  in CNF:
c    -b^{5, 3}_2 ∨ -b^{5, 3}_1 ∨ -b^{5, 3}_0 ∨ false 
c  in DIMACS:
-8435 -8436 -8437  0

c i = 4
c  -2+1 --> -1
c    ( b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧  p_20) -> ( b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0)
c  in CNF:
c    -b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨  b^{5, 5}_2
c    -b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_1
c    -b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨  b^{5, 5}_0
c  in DIMACS:
-8438 -8439  8440 -20  8441 0
-8438 -8439  8440 -20 -8442 0
-8438 -8439  8440 -20  8443 0

c  -1+1 --> 0
c    ( b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0 ∧  p_20) -> (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧ -b^{5, 5}_0)
c  in CNF:
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_2
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_1
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_0
c  in DIMACS:
-8438  8439 -8440 -20 -8441 0
-8438  8439 -8440 -20 -8442 0
-8438  8439 -8440 -20 -8443 0

c  0+1 --> 1
c    (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧  p_20) -> (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0)
c  in CNF:
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_2
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_1
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨  b^{5, 5}_0
c  in DIMACS:
 8438  8439  8440 -20 -8441 0
 8438  8439  8440 -20 -8442 0
 8438  8439  8440 -20  8443 0

c  1+1 --> 2
c    (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0 ∧  p_20) -> (-b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0)
c  in CNF:
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_2
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨  b^{5, 5}_1
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ -p_20 ∨ -b^{5, 5}_0
c  in DIMACS:
 8438  8439 -8440 -20 -8441 0
 8438  8439 -8440 -20  8442 0
 8438  8439 -8440 -20 -8443 0

c  2+1 --> break 
c    (-b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧  p_20) -> break
c  in CNF:
c     b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 8438 -8439  8440 -20 1162 0


c  2-1 --> 1
c    (-b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧ -p_20) -> (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0)
c  in CNF:
c     b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_2
c     b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_1
c     b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨  b^{5, 5}_0
c  in DIMACS:
 8438 -8439  8440  20 -8441 0
 8438 -8439  8440  20 -8442 0
 8438 -8439  8440  20  8443 0

c  1-1 --> 0
c    (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0 ∧ -p_20) -> (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧ -b^{5, 5}_0)
c  in CNF:
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_2
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_1
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_0
c  in DIMACS:
 8438  8439 -8440  20 -8441 0
 8438  8439 -8440  20 -8442 0
 8438  8439 -8440  20 -8443 0

c  0-1 --> -1
c    (-b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧ -p_20) -> ( b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0)
c  in CNF:
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨  b^{5, 5}_2
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_1
c     b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨  b^{5, 5}_0
c  in DIMACS:
 8438  8439  8440  20  8441 0
 8438  8439  8440  20 -8442 0
 8438  8439  8440  20  8443 0

c  -1-1 --> -2
c    ( b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧  b^{5, 4}_0 ∧ -p_20) -> ( b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0)
c  in CNF:
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨  b^{5, 5}_2
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨  b^{5, 5}_1
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨  p_20 ∨ -b^{5, 5}_0
c  in DIMACS:
-8438  8439 -8440  20  8441 0
-8438  8439 -8440  20  8442 0
-8438  8439 -8440  20 -8443 0

c  -2-1 --> break 
c    ( b^{5, 4}_2 ∧  b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨  b^{5, 4}_0 ∨  p_20 ∨ break
c  in DIMACS:
-8438 -8439  8440  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 4}_2 ∧ -b^{5, 4}_1 ∧ -b^{5, 4}_0 ∧ true) 
c  in CNF:
c    -b^{5, 4}_2 ∨  b^{5, 4}_1 ∨  b^{5, 4}_0 ∨ false 
c  in DIMACS:
-8438  8439  8440  0

c  3 does not represent an automaton state.
c    -(-b^{5, 4}_2 ∧  b^{5, 4}_1 ∧  b^{5, 4}_0 ∧ true) 
c  in CNF:
c     b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ false 
c  in DIMACS:
 8438 -8439 -8440  0
c  -3 does not represent an automaton state.
c    -( b^{5, 4}_2 ∧  b^{5, 4}_1 ∧  b^{5, 4}_0 ∧ true) 
c  in CNF:
c    -b^{5, 4}_2 ∨ -b^{5, 4}_1 ∨ -b^{5, 4}_0 ∨ false 
c  in DIMACS:
-8438 -8439 -8440  0

c i = 5
c  -2+1 --> -1
c    ( b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧  p_25) -> ( b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0)
c  in CNF:
c    -b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨  b^{5, 6}_2
c    -b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_1
c    -b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨  b^{5, 6}_0
c  in DIMACS:
-8441 -8442  8443 -25  8444 0
-8441 -8442  8443 -25 -8445 0
-8441 -8442  8443 -25  8446 0

c  -1+1 --> 0
c    ( b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0 ∧  p_25) -> (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧ -b^{5, 6}_0)
c  in CNF:
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_2
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_1
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_0
c  in DIMACS:
-8441  8442 -8443 -25 -8444 0
-8441  8442 -8443 -25 -8445 0
-8441  8442 -8443 -25 -8446 0

c  0+1 --> 1
c    (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧  p_25) -> (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0)
c  in CNF:
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_2
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_1
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨  b^{5, 6}_0
c  in DIMACS:
 8441  8442  8443 -25 -8444 0
 8441  8442  8443 -25 -8445 0
 8441  8442  8443 -25  8446 0

c  1+1 --> 2
c    (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0 ∧  p_25) -> (-b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0)
c  in CNF:
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_2
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨  b^{5, 6}_1
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ -p_25 ∨ -b^{5, 6}_0
c  in DIMACS:
 8441  8442 -8443 -25 -8444 0
 8441  8442 -8443 -25  8445 0
 8441  8442 -8443 -25 -8446 0

c  2+1 --> break 
c    (-b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧  p_25) -> break
c  in CNF:
c     b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ -p_25 ∨ break
c  in DIMACS:
 8441 -8442  8443 -25 1162 0


c  2-1 --> 1
c    (-b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧ -p_25) -> (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0)
c  in CNF:
c     b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_2
c     b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_1
c     b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨  b^{5, 6}_0
c  in DIMACS:
 8441 -8442  8443  25 -8444 0
 8441 -8442  8443  25 -8445 0
 8441 -8442  8443  25  8446 0

c  1-1 --> 0
c    (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0 ∧ -p_25) -> (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧ -b^{5, 6}_0)
c  in CNF:
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_2
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_1
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_0
c  in DIMACS:
 8441  8442 -8443  25 -8444 0
 8441  8442 -8443  25 -8445 0
 8441  8442 -8443  25 -8446 0

c  0-1 --> -1
c    (-b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧ -p_25) -> ( b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0)
c  in CNF:
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨  b^{5, 6}_2
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_1
c     b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨  b^{5, 6}_0
c  in DIMACS:
 8441  8442  8443  25  8444 0
 8441  8442  8443  25 -8445 0
 8441  8442  8443  25  8446 0

c  -1-1 --> -2
c    ( b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧  b^{5, 5}_0 ∧ -p_25) -> ( b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0)
c  in CNF:
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨  b^{5, 6}_2
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨  b^{5, 6}_1
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨  p_25 ∨ -b^{5, 6}_0
c  in DIMACS:
-8441  8442 -8443  25  8444 0
-8441  8442 -8443  25  8445 0
-8441  8442 -8443  25 -8446 0

c  -2-1 --> break 
c    ( b^{5, 5}_2 ∧  b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧ -p_25) -> break
c  in CNF:
c    -b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨  b^{5, 5}_0 ∨  p_25 ∨ break
c  in DIMACS:
-8441 -8442  8443  25 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 5}_2 ∧ -b^{5, 5}_1 ∧ -b^{5, 5}_0 ∧ true) 
c  in CNF:
c    -b^{5, 5}_2 ∨  b^{5, 5}_1 ∨  b^{5, 5}_0 ∨ false 
c  in DIMACS:
-8441  8442  8443  0

c  3 does not represent an automaton state.
c    -(-b^{5, 5}_2 ∧  b^{5, 5}_1 ∧  b^{5, 5}_0 ∧ true) 
c  in CNF:
c     b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ false 
c  in DIMACS:
 8441 -8442 -8443  0
c  -3 does not represent an automaton state.
c    -( b^{5, 5}_2 ∧  b^{5, 5}_1 ∧  b^{5, 5}_0 ∧ true) 
c  in CNF:
c    -b^{5, 5}_2 ∨ -b^{5, 5}_1 ∨ -b^{5, 5}_0 ∨ false 
c  in DIMACS:
-8441 -8442 -8443  0

c i = 6
c  -2+1 --> -1
c    ( b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧  p_30) -> ( b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0)
c  in CNF:
c    -b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨  b^{5, 7}_2
c    -b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_1
c    -b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨  b^{5, 7}_0
c  in DIMACS:
-8444 -8445  8446 -30  8447 0
-8444 -8445  8446 -30 -8448 0
-8444 -8445  8446 -30  8449 0

c  -1+1 --> 0
c    ( b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0 ∧  p_30) -> (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧ -b^{5, 7}_0)
c  in CNF:
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_2
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_1
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_0
c  in DIMACS:
-8444  8445 -8446 -30 -8447 0
-8444  8445 -8446 -30 -8448 0
-8444  8445 -8446 -30 -8449 0

c  0+1 --> 1
c    (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧  p_30) -> (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0)
c  in CNF:
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_2
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_1
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨  b^{5, 7}_0
c  in DIMACS:
 8444  8445  8446 -30 -8447 0
 8444  8445  8446 -30 -8448 0
 8444  8445  8446 -30  8449 0

c  1+1 --> 2
c    (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0 ∧  p_30) -> (-b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0)
c  in CNF:
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_2
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨  b^{5, 7}_1
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ -p_30 ∨ -b^{5, 7}_0
c  in DIMACS:
 8444  8445 -8446 -30 -8447 0
 8444  8445 -8446 -30  8448 0
 8444  8445 -8446 -30 -8449 0

c  2+1 --> break 
c    (-b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧  p_30) -> break
c  in CNF:
c     b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 8444 -8445  8446 -30 1162 0


c  2-1 --> 1
c    (-b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧ -p_30) -> (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0)
c  in CNF:
c     b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_2
c     b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_1
c     b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨  b^{5, 7}_0
c  in DIMACS:
 8444 -8445  8446  30 -8447 0
 8444 -8445  8446  30 -8448 0
 8444 -8445  8446  30  8449 0

c  1-1 --> 0
c    (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0 ∧ -p_30) -> (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧ -b^{5, 7}_0)
c  in CNF:
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_2
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_1
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_0
c  in DIMACS:
 8444  8445 -8446  30 -8447 0
 8444  8445 -8446  30 -8448 0
 8444  8445 -8446  30 -8449 0

c  0-1 --> -1
c    (-b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧ -p_30) -> ( b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0)
c  in CNF:
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨  b^{5, 7}_2
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_1
c     b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨  b^{5, 7}_0
c  in DIMACS:
 8444  8445  8446  30  8447 0
 8444  8445  8446  30 -8448 0
 8444  8445  8446  30  8449 0

c  -1-1 --> -2
c    ( b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧  b^{5, 6}_0 ∧ -p_30) -> ( b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0)
c  in CNF:
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨  b^{5, 7}_2
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨  b^{5, 7}_1
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨  p_30 ∨ -b^{5, 7}_0
c  in DIMACS:
-8444  8445 -8446  30  8447 0
-8444  8445 -8446  30  8448 0
-8444  8445 -8446  30 -8449 0

c  -2-1 --> break 
c    ( b^{5, 6}_2 ∧  b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨  b^{5, 6}_0 ∨  p_30 ∨ break
c  in DIMACS:
-8444 -8445  8446  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 6}_2 ∧ -b^{5, 6}_1 ∧ -b^{5, 6}_0 ∧ true) 
c  in CNF:
c    -b^{5, 6}_2 ∨  b^{5, 6}_1 ∨  b^{5, 6}_0 ∨ false 
c  in DIMACS:
-8444  8445  8446  0

c  3 does not represent an automaton state.
c    -(-b^{5, 6}_2 ∧  b^{5, 6}_1 ∧  b^{5, 6}_0 ∧ true) 
c  in CNF:
c     b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ false 
c  in DIMACS:
 8444 -8445 -8446  0
c  -3 does not represent an automaton state.
c    -( b^{5, 6}_2 ∧  b^{5, 6}_1 ∧  b^{5, 6}_0 ∧ true) 
c  in CNF:
c    -b^{5, 6}_2 ∨ -b^{5, 6}_1 ∨ -b^{5, 6}_0 ∨ false 
c  in DIMACS:
-8444 -8445 -8446  0

c i = 7
c  -2+1 --> -1
c    ( b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧  p_35) -> ( b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0)
c  in CNF:
c    -b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨  b^{5, 8}_2
c    -b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_1
c    -b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨  b^{5, 8}_0
c  in DIMACS:
-8447 -8448  8449 -35  8450 0
-8447 -8448  8449 -35 -8451 0
-8447 -8448  8449 -35  8452 0

c  -1+1 --> 0
c    ( b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0 ∧  p_35) -> (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧ -b^{5, 8}_0)
c  in CNF:
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_2
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_1
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_0
c  in DIMACS:
-8447  8448 -8449 -35 -8450 0
-8447  8448 -8449 -35 -8451 0
-8447  8448 -8449 -35 -8452 0

c  0+1 --> 1
c    (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧  p_35) -> (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0)
c  in CNF:
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_2
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_1
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨  b^{5, 8}_0
c  in DIMACS:
 8447  8448  8449 -35 -8450 0
 8447  8448  8449 -35 -8451 0
 8447  8448  8449 -35  8452 0

c  1+1 --> 2
c    (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0 ∧  p_35) -> (-b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0)
c  in CNF:
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_2
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨  b^{5, 8}_1
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ -p_35 ∨ -b^{5, 8}_0
c  in DIMACS:
 8447  8448 -8449 -35 -8450 0
 8447  8448 -8449 -35  8451 0
 8447  8448 -8449 -35 -8452 0

c  2+1 --> break 
c    (-b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧  p_35) -> break
c  in CNF:
c     b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ -p_35 ∨ break
c  in DIMACS:
 8447 -8448  8449 -35 1162 0


c  2-1 --> 1
c    (-b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧ -p_35) -> (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0)
c  in CNF:
c     b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_2
c     b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_1
c     b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨  b^{5, 8}_0
c  in DIMACS:
 8447 -8448  8449  35 -8450 0
 8447 -8448  8449  35 -8451 0
 8447 -8448  8449  35  8452 0

c  1-1 --> 0
c    (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0 ∧ -p_35) -> (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧ -b^{5, 8}_0)
c  in CNF:
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_2
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_1
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_0
c  in DIMACS:
 8447  8448 -8449  35 -8450 0
 8447  8448 -8449  35 -8451 0
 8447  8448 -8449  35 -8452 0

c  0-1 --> -1
c    (-b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧ -p_35) -> ( b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0)
c  in CNF:
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨  b^{5, 8}_2
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_1
c     b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨  b^{5, 8}_0
c  in DIMACS:
 8447  8448  8449  35  8450 0
 8447  8448  8449  35 -8451 0
 8447  8448  8449  35  8452 0

c  -1-1 --> -2
c    ( b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧  b^{5, 7}_0 ∧ -p_35) -> ( b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0)
c  in CNF:
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨  b^{5, 8}_2
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨  b^{5, 8}_1
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨  p_35 ∨ -b^{5, 8}_0
c  in DIMACS:
-8447  8448 -8449  35  8450 0
-8447  8448 -8449  35  8451 0
-8447  8448 -8449  35 -8452 0

c  -2-1 --> break 
c    ( b^{5, 7}_2 ∧  b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧ -p_35) -> break
c  in CNF:
c    -b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨  b^{5, 7}_0 ∨  p_35 ∨ break
c  in DIMACS:
-8447 -8448  8449  35 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 7}_2 ∧ -b^{5, 7}_1 ∧ -b^{5, 7}_0 ∧ true) 
c  in CNF:
c    -b^{5, 7}_2 ∨  b^{5, 7}_1 ∨  b^{5, 7}_0 ∨ false 
c  in DIMACS:
-8447  8448  8449  0

c  3 does not represent an automaton state.
c    -(-b^{5, 7}_2 ∧  b^{5, 7}_1 ∧  b^{5, 7}_0 ∧ true) 
c  in CNF:
c     b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ false 
c  in DIMACS:
 8447 -8448 -8449  0
c  -3 does not represent an automaton state.
c    -( b^{5, 7}_2 ∧  b^{5, 7}_1 ∧  b^{5, 7}_0 ∧ true) 
c  in CNF:
c    -b^{5, 7}_2 ∨ -b^{5, 7}_1 ∨ -b^{5, 7}_0 ∨ false 
c  in DIMACS:
-8447 -8448 -8449  0

c i = 8
c  -2+1 --> -1
c    ( b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧  p_40) -> ( b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0)
c  in CNF:
c    -b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨  b^{5, 9}_2
c    -b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_1
c    -b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨  b^{5, 9}_0
c  in DIMACS:
-8450 -8451  8452 -40  8453 0
-8450 -8451  8452 -40 -8454 0
-8450 -8451  8452 -40  8455 0

c  -1+1 --> 0
c    ( b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0 ∧  p_40) -> (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧ -b^{5, 9}_0)
c  in CNF:
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_2
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_1
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_0
c  in DIMACS:
-8450  8451 -8452 -40 -8453 0
-8450  8451 -8452 -40 -8454 0
-8450  8451 -8452 -40 -8455 0

c  0+1 --> 1
c    (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧  p_40) -> (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0)
c  in CNF:
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_2
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_1
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨  b^{5, 9}_0
c  in DIMACS:
 8450  8451  8452 -40 -8453 0
 8450  8451  8452 -40 -8454 0
 8450  8451  8452 -40  8455 0

c  1+1 --> 2
c    (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0 ∧  p_40) -> (-b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0)
c  in CNF:
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_2
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨  b^{5, 9}_1
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ -p_40 ∨ -b^{5, 9}_0
c  in DIMACS:
 8450  8451 -8452 -40 -8453 0
 8450  8451 -8452 -40  8454 0
 8450  8451 -8452 -40 -8455 0

c  2+1 --> break 
c    (-b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧  p_40) -> break
c  in CNF:
c     b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 8450 -8451  8452 -40 1162 0


c  2-1 --> 1
c    (-b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧ -p_40) -> (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0)
c  in CNF:
c     b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_2
c     b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_1
c     b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨  b^{5, 9}_0
c  in DIMACS:
 8450 -8451  8452  40 -8453 0
 8450 -8451  8452  40 -8454 0
 8450 -8451  8452  40  8455 0

c  1-1 --> 0
c    (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0 ∧ -p_40) -> (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧ -b^{5, 9}_0)
c  in CNF:
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_2
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_1
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_0
c  in DIMACS:
 8450  8451 -8452  40 -8453 0
 8450  8451 -8452  40 -8454 0
 8450  8451 -8452  40 -8455 0

c  0-1 --> -1
c    (-b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧ -p_40) -> ( b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0)
c  in CNF:
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨  b^{5, 9}_2
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_1
c     b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨  b^{5, 9}_0
c  in DIMACS:
 8450  8451  8452  40  8453 0
 8450  8451  8452  40 -8454 0
 8450  8451  8452  40  8455 0

c  -1-1 --> -2
c    ( b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧  b^{5, 8}_0 ∧ -p_40) -> ( b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0)
c  in CNF:
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨  b^{5, 9}_2
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨  b^{5, 9}_1
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨  p_40 ∨ -b^{5, 9}_0
c  in DIMACS:
-8450  8451 -8452  40  8453 0
-8450  8451 -8452  40  8454 0
-8450  8451 -8452  40 -8455 0

c  -2-1 --> break 
c    ( b^{5, 8}_2 ∧  b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨  b^{5, 8}_0 ∨  p_40 ∨ break
c  in DIMACS:
-8450 -8451  8452  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 8}_2 ∧ -b^{5, 8}_1 ∧ -b^{5, 8}_0 ∧ true) 
c  in CNF:
c    -b^{5, 8}_2 ∨  b^{5, 8}_1 ∨  b^{5, 8}_0 ∨ false 
c  in DIMACS:
-8450  8451  8452  0

c  3 does not represent an automaton state.
c    -(-b^{5, 8}_2 ∧  b^{5, 8}_1 ∧  b^{5, 8}_0 ∧ true) 
c  in CNF:
c     b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ false 
c  in DIMACS:
 8450 -8451 -8452  0
c  -3 does not represent an automaton state.
c    -( b^{5, 8}_2 ∧  b^{5, 8}_1 ∧  b^{5, 8}_0 ∧ true) 
c  in CNF:
c    -b^{5, 8}_2 ∨ -b^{5, 8}_1 ∨ -b^{5, 8}_0 ∨ false 
c  in DIMACS:
-8450 -8451 -8452  0

c i = 9
c  -2+1 --> -1
c    ( b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧  p_45) -> ( b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0)
c  in CNF:
c    -b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨  b^{5, 10}_2
c    -b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_1
c    -b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨  b^{5, 10}_0
c  in DIMACS:
-8453 -8454  8455 -45  8456 0
-8453 -8454  8455 -45 -8457 0
-8453 -8454  8455 -45  8458 0

c  -1+1 --> 0
c    ( b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0 ∧  p_45) -> (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧ -b^{5, 10}_0)
c  in CNF:
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_2
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_1
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_0
c  in DIMACS:
-8453  8454 -8455 -45 -8456 0
-8453  8454 -8455 -45 -8457 0
-8453  8454 -8455 -45 -8458 0

c  0+1 --> 1
c    (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧  p_45) -> (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0)
c  in CNF:
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_2
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_1
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨  b^{5, 10}_0
c  in DIMACS:
 8453  8454  8455 -45 -8456 0
 8453  8454  8455 -45 -8457 0
 8453  8454  8455 -45  8458 0

c  1+1 --> 2
c    (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0 ∧  p_45) -> (-b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0)
c  in CNF:
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_2
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨  b^{5, 10}_1
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ -p_45 ∨ -b^{5, 10}_0
c  in DIMACS:
 8453  8454 -8455 -45 -8456 0
 8453  8454 -8455 -45  8457 0
 8453  8454 -8455 -45 -8458 0

c  2+1 --> break 
c    (-b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧  p_45) -> break
c  in CNF:
c     b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 8453 -8454  8455 -45 1162 0


c  2-1 --> 1
c    (-b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧ -p_45) -> (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0)
c  in CNF:
c     b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_2
c     b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_1
c     b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨  b^{5, 10}_0
c  in DIMACS:
 8453 -8454  8455  45 -8456 0
 8453 -8454  8455  45 -8457 0
 8453 -8454  8455  45  8458 0

c  1-1 --> 0
c    (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0 ∧ -p_45) -> (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧ -b^{5, 10}_0)
c  in CNF:
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_2
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_1
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_0
c  in DIMACS:
 8453  8454 -8455  45 -8456 0
 8453  8454 -8455  45 -8457 0
 8453  8454 -8455  45 -8458 0

c  0-1 --> -1
c    (-b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧ -p_45) -> ( b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0)
c  in CNF:
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨  b^{5, 10}_2
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_1
c     b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨  b^{5, 10}_0
c  in DIMACS:
 8453  8454  8455  45  8456 0
 8453  8454  8455  45 -8457 0
 8453  8454  8455  45  8458 0

c  -1-1 --> -2
c    ( b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧  b^{5, 9}_0 ∧ -p_45) -> ( b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0)
c  in CNF:
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨  b^{5, 10}_2
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨  b^{5, 10}_1
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨  p_45 ∨ -b^{5, 10}_0
c  in DIMACS:
-8453  8454 -8455  45  8456 0
-8453  8454 -8455  45  8457 0
-8453  8454 -8455  45 -8458 0

c  -2-1 --> break 
c    ( b^{5, 9}_2 ∧  b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨  b^{5, 9}_0 ∨  p_45 ∨ break
c  in DIMACS:
-8453 -8454  8455  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 9}_2 ∧ -b^{5, 9}_1 ∧ -b^{5, 9}_0 ∧ true) 
c  in CNF:
c    -b^{5, 9}_2 ∨  b^{5, 9}_1 ∨  b^{5, 9}_0 ∨ false 
c  in DIMACS:
-8453  8454  8455  0

c  3 does not represent an automaton state.
c    -(-b^{5, 9}_2 ∧  b^{5, 9}_1 ∧  b^{5, 9}_0 ∧ true) 
c  in CNF:
c     b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ false 
c  in DIMACS:
 8453 -8454 -8455  0
c  -3 does not represent an automaton state.
c    -( b^{5, 9}_2 ∧  b^{5, 9}_1 ∧  b^{5, 9}_0 ∧ true) 
c  in CNF:
c    -b^{5, 9}_2 ∨ -b^{5, 9}_1 ∨ -b^{5, 9}_0 ∨ false 
c  in DIMACS:
-8453 -8454 -8455  0

c i = 10
c  -2+1 --> -1
c    ( b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧  p_50) -> ( b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0)
c  in CNF:
c    -b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨  b^{5, 11}_2
c    -b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_1
c    -b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨  b^{5, 11}_0
c  in DIMACS:
-8456 -8457  8458 -50  8459 0
-8456 -8457  8458 -50 -8460 0
-8456 -8457  8458 -50  8461 0

c  -1+1 --> 0
c    ( b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0 ∧  p_50) -> (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧ -b^{5, 11}_0)
c  in CNF:
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_2
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_1
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_0
c  in DIMACS:
-8456  8457 -8458 -50 -8459 0
-8456  8457 -8458 -50 -8460 0
-8456  8457 -8458 -50 -8461 0

c  0+1 --> 1
c    (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧  p_50) -> (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0)
c  in CNF:
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_2
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_1
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨  b^{5, 11}_0
c  in DIMACS:
 8456  8457  8458 -50 -8459 0
 8456  8457  8458 -50 -8460 0
 8456  8457  8458 -50  8461 0

c  1+1 --> 2
c    (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0 ∧  p_50) -> (-b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0)
c  in CNF:
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_2
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨  b^{5, 11}_1
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ -p_50 ∨ -b^{5, 11}_0
c  in DIMACS:
 8456  8457 -8458 -50 -8459 0
 8456  8457 -8458 -50  8460 0
 8456  8457 -8458 -50 -8461 0

c  2+1 --> break 
c    (-b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧  p_50) -> break
c  in CNF:
c     b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 8456 -8457  8458 -50 1162 0


c  2-1 --> 1
c    (-b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧ -p_50) -> (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0)
c  in CNF:
c     b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_2
c     b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_1
c     b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨  b^{5, 11}_0
c  in DIMACS:
 8456 -8457  8458  50 -8459 0
 8456 -8457  8458  50 -8460 0
 8456 -8457  8458  50  8461 0

c  1-1 --> 0
c    (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0 ∧ -p_50) -> (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧ -b^{5, 11}_0)
c  in CNF:
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_2
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_1
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_0
c  in DIMACS:
 8456  8457 -8458  50 -8459 0
 8456  8457 -8458  50 -8460 0
 8456  8457 -8458  50 -8461 0

c  0-1 --> -1
c    (-b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧ -p_50) -> ( b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0)
c  in CNF:
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨  b^{5, 11}_2
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_1
c     b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨  b^{5, 11}_0
c  in DIMACS:
 8456  8457  8458  50  8459 0
 8456  8457  8458  50 -8460 0
 8456  8457  8458  50  8461 0

c  -1-1 --> -2
c    ( b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧  b^{5, 10}_0 ∧ -p_50) -> ( b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0)
c  in CNF:
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨  b^{5, 11}_2
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨  b^{5, 11}_1
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨  p_50 ∨ -b^{5, 11}_0
c  in DIMACS:
-8456  8457 -8458  50  8459 0
-8456  8457 -8458  50  8460 0
-8456  8457 -8458  50 -8461 0

c  -2-1 --> break 
c    ( b^{5, 10}_2 ∧  b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨  b^{5, 10}_0 ∨  p_50 ∨ break
c  in DIMACS:
-8456 -8457  8458  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 10}_2 ∧ -b^{5, 10}_1 ∧ -b^{5, 10}_0 ∧ true) 
c  in CNF:
c    -b^{5, 10}_2 ∨  b^{5, 10}_1 ∨  b^{5, 10}_0 ∨ false 
c  in DIMACS:
-8456  8457  8458  0

c  3 does not represent an automaton state.
c    -(-b^{5, 10}_2 ∧  b^{5, 10}_1 ∧  b^{5, 10}_0 ∧ true) 
c  in CNF:
c     b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ false 
c  in DIMACS:
 8456 -8457 -8458  0
c  -3 does not represent an automaton state.
c    -( b^{5, 10}_2 ∧  b^{5, 10}_1 ∧  b^{5, 10}_0 ∧ true) 
c  in CNF:
c    -b^{5, 10}_2 ∨ -b^{5, 10}_1 ∨ -b^{5, 10}_0 ∨ false 
c  in DIMACS:
-8456 -8457 -8458  0

c i = 11
c  -2+1 --> -1
c    ( b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧  p_55) -> ( b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0)
c  in CNF:
c    -b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨  b^{5, 12}_2
c    -b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_1
c    -b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨  b^{5, 12}_0
c  in DIMACS:
-8459 -8460  8461 -55  8462 0
-8459 -8460  8461 -55 -8463 0
-8459 -8460  8461 -55  8464 0

c  -1+1 --> 0
c    ( b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0 ∧  p_55) -> (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧ -b^{5, 12}_0)
c  in CNF:
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_2
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_1
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_0
c  in DIMACS:
-8459  8460 -8461 -55 -8462 0
-8459  8460 -8461 -55 -8463 0
-8459  8460 -8461 -55 -8464 0

c  0+1 --> 1
c    (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧  p_55) -> (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0)
c  in CNF:
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_2
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_1
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨  b^{5, 12}_0
c  in DIMACS:
 8459  8460  8461 -55 -8462 0
 8459  8460  8461 -55 -8463 0
 8459  8460  8461 -55  8464 0

c  1+1 --> 2
c    (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0 ∧  p_55) -> (-b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0)
c  in CNF:
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_2
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨  b^{5, 12}_1
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ -p_55 ∨ -b^{5, 12}_0
c  in DIMACS:
 8459  8460 -8461 -55 -8462 0
 8459  8460 -8461 -55  8463 0
 8459  8460 -8461 -55 -8464 0

c  2+1 --> break 
c    (-b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧  p_55) -> break
c  in CNF:
c     b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ -p_55 ∨ break
c  in DIMACS:
 8459 -8460  8461 -55 1162 0


c  2-1 --> 1
c    (-b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧ -p_55) -> (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0)
c  in CNF:
c     b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_2
c     b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_1
c     b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨  b^{5, 12}_0
c  in DIMACS:
 8459 -8460  8461  55 -8462 0
 8459 -8460  8461  55 -8463 0
 8459 -8460  8461  55  8464 0

c  1-1 --> 0
c    (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0 ∧ -p_55) -> (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧ -b^{5, 12}_0)
c  in CNF:
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_2
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_1
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_0
c  in DIMACS:
 8459  8460 -8461  55 -8462 0
 8459  8460 -8461  55 -8463 0
 8459  8460 -8461  55 -8464 0

c  0-1 --> -1
c    (-b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧ -p_55) -> ( b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0)
c  in CNF:
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨  b^{5, 12}_2
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_1
c     b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨  b^{5, 12}_0
c  in DIMACS:
 8459  8460  8461  55  8462 0
 8459  8460  8461  55 -8463 0
 8459  8460  8461  55  8464 0

c  -1-1 --> -2
c    ( b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧  b^{5, 11}_0 ∧ -p_55) -> ( b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0)
c  in CNF:
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨  b^{5, 12}_2
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨  b^{5, 12}_1
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨  p_55 ∨ -b^{5, 12}_0
c  in DIMACS:
-8459  8460 -8461  55  8462 0
-8459  8460 -8461  55  8463 0
-8459  8460 -8461  55 -8464 0

c  -2-1 --> break 
c    ( b^{5, 11}_2 ∧  b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧ -p_55) -> break
c  in CNF:
c    -b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨  b^{5, 11}_0 ∨  p_55 ∨ break
c  in DIMACS:
-8459 -8460  8461  55 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 11}_2 ∧ -b^{5, 11}_1 ∧ -b^{5, 11}_0 ∧ true) 
c  in CNF:
c    -b^{5, 11}_2 ∨  b^{5, 11}_1 ∨  b^{5, 11}_0 ∨ false 
c  in DIMACS:
-8459  8460  8461  0

c  3 does not represent an automaton state.
c    -(-b^{5, 11}_2 ∧  b^{5, 11}_1 ∧  b^{5, 11}_0 ∧ true) 
c  in CNF:
c     b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ false 
c  in DIMACS:
 8459 -8460 -8461  0
c  -3 does not represent an automaton state.
c    -( b^{5, 11}_2 ∧  b^{5, 11}_1 ∧  b^{5, 11}_0 ∧ true) 
c  in CNF:
c    -b^{5, 11}_2 ∨ -b^{5, 11}_1 ∨ -b^{5, 11}_0 ∨ false 
c  in DIMACS:
-8459 -8460 -8461  0

c i = 12
c  -2+1 --> -1
c    ( b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧  p_60) -> ( b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0)
c  in CNF:
c    -b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨  b^{5, 13}_2
c    -b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_1
c    -b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨  b^{5, 13}_0
c  in DIMACS:
-8462 -8463  8464 -60  8465 0
-8462 -8463  8464 -60 -8466 0
-8462 -8463  8464 -60  8467 0

c  -1+1 --> 0
c    ( b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0 ∧  p_60) -> (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧ -b^{5, 13}_0)
c  in CNF:
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_2
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_1
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_0
c  in DIMACS:
-8462  8463 -8464 -60 -8465 0
-8462  8463 -8464 -60 -8466 0
-8462  8463 -8464 -60 -8467 0

c  0+1 --> 1
c    (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧  p_60) -> (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0)
c  in CNF:
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_2
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_1
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨  b^{5, 13}_0
c  in DIMACS:
 8462  8463  8464 -60 -8465 0
 8462  8463  8464 -60 -8466 0
 8462  8463  8464 -60  8467 0

c  1+1 --> 2
c    (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0 ∧  p_60) -> (-b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0)
c  in CNF:
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_2
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨  b^{5, 13}_1
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ -p_60 ∨ -b^{5, 13}_0
c  in DIMACS:
 8462  8463 -8464 -60 -8465 0
 8462  8463 -8464 -60  8466 0
 8462  8463 -8464 -60 -8467 0

c  2+1 --> break 
c    (-b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧  p_60) -> break
c  in CNF:
c     b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 8462 -8463  8464 -60 1162 0


c  2-1 --> 1
c    (-b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧ -p_60) -> (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0)
c  in CNF:
c     b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_2
c     b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_1
c     b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨  b^{5, 13}_0
c  in DIMACS:
 8462 -8463  8464  60 -8465 0
 8462 -8463  8464  60 -8466 0
 8462 -8463  8464  60  8467 0

c  1-1 --> 0
c    (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0 ∧ -p_60) -> (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧ -b^{5, 13}_0)
c  in CNF:
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_2
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_1
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_0
c  in DIMACS:
 8462  8463 -8464  60 -8465 0
 8462  8463 -8464  60 -8466 0
 8462  8463 -8464  60 -8467 0

c  0-1 --> -1
c    (-b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧ -p_60) -> ( b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0)
c  in CNF:
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨  b^{5, 13}_2
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_1
c     b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨  b^{5, 13}_0
c  in DIMACS:
 8462  8463  8464  60  8465 0
 8462  8463  8464  60 -8466 0
 8462  8463  8464  60  8467 0

c  -1-1 --> -2
c    ( b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧  b^{5, 12}_0 ∧ -p_60) -> ( b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0)
c  in CNF:
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨  b^{5, 13}_2
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨  b^{5, 13}_1
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨  p_60 ∨ -b^{5, 13}_0
c  in DIMACS:
-8462  8463 -8464  60  8465 0
-8462  8463 -8464  60  8466 0
-8462  8463 -8464  60 -8467 0

c  -2-1 --> break 
c    ( b^{5, 12}_2 ∧  b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨  b^{5, 12}_0 ∨  p_60 ∨ break
c  in DIMACS:
-8462 -8463  8464  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 12}_2 ∧ -b^{5, 12}_1 ∧ -b^{5, 12}_0 ∧ true) 
c  in CNF:
c    -b^{5, 12}_2 ∨  b^{5, 12}_1 ∨  b^{5, 12}_0 ∨ false 
c  in DIMACS:
-8462  8463  8464  0

c  3 does not represent an automaton state.
c    -(-b^{5, 12}_2 ∧  b^{5, 12}_1 ∧  b^{5, 12}_0 ∧ true) 
c  in CNF:
c     b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ false 
c  in DIMACS:
 8462 -8463 -8464  0
c  -3 does not represent an automaton state.
c    -( b^{5, 12}_2 ∧  b^{5, 12}_1 ∧  b^{5, 12}_0 ∧ true) 
c  in CNF:
c    -b^{5, 12}_2 ∨ -b^{5, 12}_1 ∨ -b^{5, 12}_0 ∨ false 
c  in DIMACS:
-8462 -8463 -8464  0

c i = 13
c  -2+1 --> -1
c    ( b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧  p_65) -> ( b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0)
c  in CNF:
c    -b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨  b^{5, 14}_2
c    -b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_1
c    -b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨  b^{5, 14}_0
c  in DIMACS:
-8465 -8466  8467 -65  8468 0
-8465 -8466  8467 -65 -8469 0
-8465 -8466  8467 -65  8470 0

c  -1+1 --> 0
c    ( b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0 ∧  p_65) -> (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧ -b^{5, 14}_0)
c  in CNF:
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_2
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_1
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_0
c  in DIMACS:
-8465  8466 -8467 -65 -8468 0
-8465  8466 -8467 -65 -8469 0
-8465  8466 -8467 -65 -8470 0

c  0+1 --> 1
c    (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧  p_65) -> (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0)
c  in CNF:
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_2
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_1
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨  b^{5, 14}_0
c  in DIMACS:
 8465  8466  8467 -65 -8468 0
 8465  8466  8467 -65 -8469 0
 8465  8466  8467 -65  8470 0

c  1+1 --> 2
c    (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0 ∧  p_65) -> (-b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0)
c  in CNF:
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_2
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨  b^{5, 14}_1
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ -p_65 ∨ -b^{5, 14}_0
c  in DIMACS:
 8465  8466 -8467 -65 -8468 0
 8465  8466 -8467 -65  8469 0
 8465  8466 -8467 -65 -8470 0

c  2+1 --> break 
c    (-b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧  p_65) -> break
c  in CNF:
c     b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ -p_65 ∨ break
c  in DIMACS:
 8465 -8466  8467 -65 1162 0


c  2-1 --> 1
c    (-b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧ -p_65) -> (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0)
c  in CNF:
c     b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_2
c     b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_1
c     b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨  b^{5, 14}_0
c  in DIMACS:
 8465 -8466  8467  65 -8468 0
 8465 -8466  8467  65 -8469 0
 8465 -8466  8467  65  8470 0

c  1-1 --> 0
c    (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0 ∧ -p_65) -> (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧ -b^{5, 14}_0)
c  in CNF:
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_2
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_1
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_0
c  in DIMACS:
 8465  8466 -8467  65 -8468 0
 8465  8466 -8467  65 -8469 0
 8465  8466 -8467  65 -8470 0

c  0-1 --> -1
c    (-b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧ -p_65) -> ( b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0)
c  in CNF:
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨  b^{5, 14}_2
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_1
c     b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨  b^{5, 14}_0
c  in DIMACS:
 8465  8466  8467  65  8468 0
 8465  8466  8467  65 -8469 0
 8465  8466  8467  65  8470 0

c  -1-1 --> -2
c    ( b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧  b^{5, 13}_0 ∧ -p_65) -> ( b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0)
c  in CNF:
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨  b^{5, 14}_2
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨  b^{5, 14}_1
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨  p_65 ∨ -b^{5, 14}_0
c  in DIMACS:
-8465  8466 -8467  65  8468 0
-8465  8466 -8467  65  8469 0
-8465  8466 -8467  65 -8470 0

c  -2-1 --> break 
c    ( b^{5, 13}_2 ∧  b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧ -p_65) -> break
c  in CNF:
c    -b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨  b^{5, 13}_0 ∨  p_65 ∨ break
c  in DIMACS:
-8465 -8466  8467  65 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 13}_2 ∧ -b^{5, 13}_1 ∧ -b^{5, 13}_0 ∧ true) 
c  in CNF:
c    -b^{5, 13}_2 ∨  b^{5, 13}_1 ∨  b^{5, 13}_0 ∨ false 
c  in DIMACS:
-8465  8466  8467  0

c  3 does not represent an automaton state.
c    -(-b^{5, 13}_2 ∧  b^{5, 13}_1 ∧  b^{5, 13}_0 ∧ true) 
c  in CNF:
c     b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ false 
c  in DIMACS:
 8465 -8466 -8467  0
c  -3 does not represent an automaton state.
c    -( b^{5, 13}_2 ∧  b^{5, 13}_1 ∧  b^{5, 13}_0 ∧ true) 
c  in CNF:
c    -b^{5, 13}_2 ∨ -b^{5, 13}_1 ∨ -b^{5, 13}_0 ∨ false 
c  in DIMACS:
-8465 -8466 -8467  0

c i = 14
c  -2+1 --> -1
c    ( b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧  p_70) -> ( b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0)
c  in CNF:
c    -b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨  b^{5, 15}_2
c    -b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_1
c    -b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨  b^{5, 15}_0
c  in DIMACS:
-8468 -8469  8470 -70  8471 0
-8468 -8469  8470 -70 -8472 0
-8468 -8469  8470 -70  8473 0

c  -1+1 --> 0
c    ( b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0 ∧  p_70) -> (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧ -b^{5, 15}_0)
c  in CNF:
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_2
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_1
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_0
c  in DIMACS:
-8468  8469 -8470 -70 -8471 0
-8468  8469 -8470 -70 -8472 0
-8468  8469 -8470 -70 -8473 0

c  0+1 --> 1
c    (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧  p_70) -> (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0)
c  in CNF:
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_2
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_1
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨  b^{5, 15}_0
c  in DIMACS:
 8468  8469  8470 -70 -8471 0
 8468  8469  8470 -70 -8472 0
 8468  8469  8470 -70  8473 0

c  1+1 --> 2
c    (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0 ∧  p_70) -> (-b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0)
c  in CNF:
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_2
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨  b^{5, 15}_1
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ -p_70 ∨ -b^{5, 15}_0
c  in DIMACS:
 8468  8469 -8470 -70 -8471 0
 8468  8469 -8470 -70  8472 0
 8468  8469 -8470 -70 -8473 0

c  2+1 --> break 
c    (-b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧  p_70) -> break
c  in CNF:
c     b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 8468 -8469  8470 -70 1162 0


c  2-1 --> 1
c    (-b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧ -p_70) -> (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0)
c  in CNF:
c     b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_2
c     b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_1
c     b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨  b^{5, 15}_0
c  in DIMACS:
 8468 -8469  8470  70 -8471 0
 8468 -8469  8470  70 -8472 0
 8468 -8469  8470  70  8473 0

c  1-1 --> 0
c    (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0 ∧ -p_70) -> (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧ -b^{5, 15}_0)
c  in CNF:
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_2
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_1
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_0
c  in DIMACS:
 8468  8469 -8470  70 -8471 0
 8468  8469 -8470  70 -8472 0
 8468  8469 -8470  70 -8473 0

c  0-1 --> -1
c    (-b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧ -p_70) -> ( b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0)
c  in CNF:
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨  b^{5, 15}_2
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_1
c     b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨  b^{5, 15}_0
c  in DIMACS:
 8468  8469  8470  70  8471 0
 8468  8469  8470  70 -8472 0
 8468  8469  8470  70  8473 0

c  -1-1 --> -2
c    ( b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧  b^{5, 14}_0 ∧ -p_70) -> ( b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0)
c  in CNF:
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨  b^{5, 15}_2
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨  b^{5, 15}_1
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨  p_70 ∨ -b^{5, 15}_0
c  in DIMACS:
-8468  8469 -8470  70  8471 0
-8468  8469 -8470  70  8472 0
-8468  8469 -8470  70 -8473 0

c  -2-1 --> break 
c    ( b^{5, 14}_2 ∧  b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨  b^{5, 14}_0 ∨  p_70 ∨ break
c  in DIMACS:
-8468 -8469  8470  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 14}_2 ∧ -b^{5, 14}_1 ∧ -b^{5, 14}_0 ∧ true) 
c  in CNF:
c    -b^{5, 14}_2 ∨  b^{5, 14}_1 ∨  b^{5, 14}_0 ∨ false 
c  in DIMACS:
-8468  8469  8470  0

c  3 does not represent an automaton state.
c    -(-b^{5, 14}_2 ∧  b^{5, 14}_1 ∧  b^{5, 14}_0 ∧ true) 
c  in CNF:
c     b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ false 
c  in DIMACS:
 8468 -8469 -8470  0
c  -3 does not represent an automaton state.
c    -( b^{5, 14}_2 ∧  b^{5, 14}_1 ∧  b^{5, 14}_0 ∧ true) 
c  in CNF:
c    -b^{5, 14}_2 ∨ -b^{5, 14}_1 ∨ -b^{5, 14}_0 ∨ false 
c  in DIMACS:
-8468 -8469 -8470  0

c i = 15
c  -2+1 --> -1
c    ( b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧  p_75) -> ( b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0)
c  in CNF:
c    -b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨  b^{5, 16}_2
c    -b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_1
c    -b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨  b^{5, 16}_0
c  in DIMACS:
-8471 -8472  8473 -75  8474 0
-8471 -8472  8473 -75 -8475 0
-8471 -8472  8473 -75  8476 0

c  -1+1 --> 0
c    ( b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0 ∧  p_75) -> (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧ -b^{5, 16}_0)
c  in CNF:
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_2
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_1
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_0
c  in DIMACS:
-8471  8472 -8473 -75 -8474 0
-8471  8472 -8473 -75 -8475 0
-8471  8472 -8473 -75 -8476 0

c  0+1 --> 1
c    (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧  p_75) -> (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0)
c  in CNF:
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_2
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_1
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨  b^{5, 16}_0
c  in DIMACS:
 8471  8472  8473 -75 -8474 0
 8471  8472  8473 -75 -8475 0
 8471  8472  8473 -75  8476 0

c  1+1 --> 2
c    (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0 ∧  p_75) -> (-b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0)
c  in CNF:
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_2
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨  b^{5, 16}_1
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ -p_75 ∨ -b^{5, 16}_0
c  in DIMACS:
 8471  8472 -8473 -75 -8474 0
 8471  8472 -8473 -75  8475 0
 8471  8472 -8473 -75 -8476 0

c  2+1 --> break 
c    (-b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧  p_75) -> break
c  in CNF:
c     b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 8471 -8472  8473 -75 1162 0


c  2-1 --> 1
c    (-b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧ -p_75) -> (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0)
c  in CNF:
c     b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_2
c     b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_1
c     b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨  b^{5, 16}_0
c  in DIMACS:
 8471 -8472  8473  75 -8474 0
 8471 -8472  8473  75 -8475 0
 8471 -8472  8473  75  8476 0

c  1-1 --> 0
c    (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0 ∧ -p_75) -> (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧ -b^{5, 16}_0)
c  in CNF:
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_2
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_1
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_0
c  in DIMACS:
 8471  8472 -8473  75 -8474 0
 8471  8472 -8473  75 -8475 0
 8471  8472 -8473  75 -8476 0

c  0-1 --> -1
c    (-b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧ -p_75) -> ( b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0)
c  in CNF:
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨  b^{5, 16}_2
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_1
c     b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨  b^{5, 16}_0
c  in DIMACS:
 8471  8472  8473  75  8474 0
 8471  8472  8473  75 -8475 0
 8471  8472  8473  75  8476 0

c  -1-1 --> -2
c    ( b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧  b^{5, 15}_0 ∧ -p_75) -> ( b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0)
c  in CNF:
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨  b^{5, 16}_2
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨  b^{5, 16}_1
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨  p_75 ∨ -b^{5, 16}_0
c  in DIMACS:
-8471  8472 -8473  75  8474 0
-8471  8472 -8473  75  8475 0
-8471  8472 -8473  75 -8476 0

c  -2-1 --> break 
c    ( b^{5, 15}_2 ∧  b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨  b^{5, 15}_0 ∨  p_75 ∨ break
c  in DIMACS:
-8471 -8472  8473  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 15}_2 ∧ -b^{5, 15}_1 ∧ -b^{5, 15}_0 ∧ true) 
c  in CNF:
c    -b^{5, 15}_2 ∨  b^{5, 15}_1 ∨  b^{5, 15}_0 ∨ false 
c  in DIMACS:
-8471  8472  8473  0

c  3 does not represent an automaton state.
c    -(-b^{5, 15}_2 ∧  b^{5, 15}_1 ∧  b^{5, 15}_0 ∧ true) 
c  in CNF:
c     b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ false 
c  in DIMACS:
 8471 -8472 -8473  0
c  -3 does not represent an automaton state.
c    -( b^{5, 15}_2 ∧  b^{5, 15}_1 ∧  b^{5, 15}_0 ∧ true) 
c  in CNF:
c    -b^{5, 15}_2 ∨ -b^{5, 15}_1 ∨ -b^{5, 15}_0 ∨ false 
c  in DIMACS:
-8471 -8472 -8473  0

c i = 16
c  -2+1 --> -1
c    ( b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧  p_80) -> ( b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0)
c  in CNF:
c    -b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨  b^{5, 17}_2
c    -b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_1
c    -b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨  b^{5, 17}_0
c  in DIMACS:
-8474 -8475  8476 -80  8477 0
-8474 -8475  8476 -80 -8478 0
-8474 -8475  8476 -80  8479 0

c  -1+1 --> 0
c    ( b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0 ∧  p_80) -> (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧ -b^{5, 17}_0)
c  in CNF:
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_2
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_1
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_0
c  in DIMACS:
-8474  8475 -8476 -80 -8477 0
-8474  8475 -8476 -80 -8478 0
-8474  8475 -8476 -80 -8479 0

c  0+1 --> 1
c    (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧  p_80) -> (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0)
c  in CNF:
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_2
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_1
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨  b^{5, 17}_0
c  in DIMACS:
 8474  8475  8476 -80 -8477 0
 8474  8475  8476 -80 -8478 0
 8474  8475  8476 -80  8479 0

c  1+1 --> 2
c    (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0 ∧  p_80) -> (-b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0)
c  in CNF:
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_2
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨  b^{5, 17}_1
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ -p_80 ∨ -b^{5, 17}_0
c  in DIMACS:
 8474  8475 -8476 -80 -8477 0
 8474  8475 -8476 -80  8478 0
 8474  8475 -8476 -80 -8479 0

c  2+1 --> break 
c    (-b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧  p_80) -> break
c  in CNF:
c     b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 8474 -8475  8476 -80 1162 0


c  2-1 --> 1
c    (-b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧ -p_80) -> (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0)
c  in CNF:
c     b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_2
c     b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_1
c     b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨  b^{5, 17}_0
c  in DIMACS:
 8474 -8475  8476  80 -8477 0
 8474 -8475  8476  80 -8478 0
 8474 -8475  8476  80  8479 0

c  1-1 --> 0
c    (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0 ∧ -p_80) -> (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧ -b^{5, 17}_0)
c  in CNF:
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_2
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_1
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_0
c  in DIMACS:
 8474  8475 -8476  80 -8477 0
 8474  8475 -8476  80 -8478 0
 8474  8475 -8476  80 -8479 0

c  0-1 --> -1
c    (-b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧ -p_80) -> ( b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0)
c  in CNF:
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨  b^{5, 17}_2
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_1
c     b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨  b^{5, 17}_0
c  in DIMACS:
 8474  8475  8476  80  8477 0
 8474  8475  8476  80 -8478 0
 8474  8475  8476  80  8479 0

c  -1-1 --> -2
c    ( b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧  b^{5, 16}_0 ∧ -p_80) -> ( b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0)
c  in CNF:
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨  b^{5, 17}_2
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨  b^{5, 17}_1
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨  p_80 ∨ -b^{5, 17}_0
c  in DIMACS:
-8474  8475 -8476  80  8477 0
-8474  8475 -8476  80  8478 0
-8474  8475 -8476  80 -8479 0

c  -2-1 --> break 
c    ( b^{5, 16}_2 ∧  b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨  b^{5, 16}_0 ∨  p_80 ∨ break
c  in DIMACS:
-8474 -8475  8476  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 16}_2 ∧ -b^{5, 16}_1 ∧ -b^{5, 16}_0 ∧ true) 
c  in CNF:
c    -b^{5, 16}_2 ∨  b^{5, 16}_1 ∨  b^{5, 16}_0 ∨ false 
c  in DIMACS:
-8474  8475  8476  0

c  3 does not represent an automaton state.
c    -(-b^{5, 16}_2 ∧  b^{5, 16}_1 ∧  b^{5, 16}_0 ∧ true) 
c  in CNF:
c     b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ false 
c  in DIMACS:
 8474 -8475 -8476  0
c  -3 does not represent an automaton state.
c    -( b^{5, 16}_2 ∧  b^{5, 16}_1 ∧  b^{5, 16}_0 ∧ true) 
c  in CNF:
c    -b^{5, 16}_2 ∨ -b^{5, 16}_1 ∨ -b^{5, 16}_0 ∨ false 
c  in DIMACS:
-8474 -8475 -8476  0

c i = 17
c  -2+1 --> -1
c    ( b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧  p_85) -> ( b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0)
c  in CNF:
c    -b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨  b^{5, 18}_2
c    -b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_1
c    -b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨  b^{5, 18}_0
c  in DIMACS:
-8477 -8478  8479 -85  8480 0
-8477 -8478  8479 -85 -8481 0
-8477 -8478  8479 -85  8482 0

c  -1+1 --> 0
c    ( b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0 ∧  p_85) -> (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧ -b^{5, 18}_0)
c  in CNF:
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_2
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_1
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_0
c  in DIMACS:
-8477  8478 -8479 -85 -8480 0
-8477  8478 -8479 -85 -8481 0
-8477  8478 -8479 -85 -8482 0

c  0+1 --> 1
c    (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧  p_85) -> (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0)
c  in CNF:
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_2
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_1
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨  b^{5, 18}_0
c  in DIMACS:
 8477  8478  8479 -85 -8480 0
 8477  8478  8479 -85 -8481 0
 8477  8478  8479 -85  8482 0

c  1+1 --> 2
c    (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0 ∧  p_85) -> (-b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0)
c  in CNF:
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_2
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨  b^{5, 18}_1
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ -p_85 ∨ -b^{5, 18}_0
c  in DIMACS:
 8477  8478 -8479 -85 -8480 0
 8477  8478 -8479 -85  8481 0
 8477  8478 -8479 -85 -8482 0

c  2+1 --> break 
c    (-b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧  p_85) -> break
c  in CNF:
c     b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ -p_85 ∨ break
c  in DIMACS:
 8477 -8478  8479 -85 1162 0


c  2-1 --> 1
c    (-b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧ -p_85) -> (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0)
c  in CNF:
c     b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_2
c     b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_1
c     b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨  b^{5, 18}_0
c  in DIMACS:
 8477 -8478  8479  85 -8480 0
 8477 -8478  8479  85 -8481 0
 8477 -8478  8479  85  8482 0

c  1-1 --> 0
c    (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0 ∧ -p_85) -> (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧ -b^{5, 18}_0)
c  in CNF:
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_2
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_1
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_0
c  in DIMACS:
 8477  8478 -8479  85 -8480 0
 8477  8478 -8479  85 -8481 0
 8477  8478 -8479  85 -8482 0

c  0-1 --> -1
c    (-b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧ -p_85) -> ( b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0)
c  in CNF:
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨  b^{5, 18}_2
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_1
c     b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨  b^{5, 18}_0
c  in DIMACS:
 8477  8478  8479  85  8480 0
 8477  8478  8479  85 -8481 0
 8477  8478  8479  85  8482 0

c  -1-1 --> -2
c    ( b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧  b^{5, 17}_0 ∧ -p_85) -> ( b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0)
c  in CNF:
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨  b^{5, 18}_2
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨  b^{5, 18}_1
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨  p_85 ∨ -b^{5, 18}_0
c  in DIMACS:
-8477  8478 -8479  85  8480 0
-8477  8478 -8479  85  8481 0
-8477  8478 -8479  85 -8482 0

c  -2-1 --> break 
c    ( b^{5, 17}_2 ∧  b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧ -p_85) -> break
c  in CNF:
c    -b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨  b^{5, 17}_0 ∨  p_85 ∨ break
c  in DIMACS:
-8477 -8478  8479  85 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 17}_2 ∧ -b^{5, 17}_1 ∧ -b^{5, 17}_0 ∧ true) 
c  in CNF:
c    -b^{5, 17}_2 ∨  b^{5, 17}_1 ∨  b^{5, 17}_0 ∨ false 
c  in DIMACS:
-8477  8478  8479  0

c  3 does not represent an automaton state.
c    -(-b^{5, 17}_2 ∧  b^{5, 17}_1 ∧  b^{5, 17}_0 ∧ true) 
c  in CNF:
c     b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ false 
c  in DIMACS:
 8477 -8478 -8479  0
c  -3 does not represent an automaton state.
c    -( b^{5, 17}_2 ∧  b^{5, 17}_1 ∧  b^{5, 17}_0 ∧ true) 
c  in CNF:
c    -b^{5, 17}_2 ∨ -b^{5, 17}_1 ∨ -b^{5, 17}_0 ∨ false 
c  in DIMACS:
-8477 -8478 -8479  0

c i = 18
c  -2+1 --> -1
c    ( b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧  p_90) -> ( b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0)
c  in CNF:
c    -b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨  b^{5, 19}_2
c    -b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_1
c    -b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨  b^{5, 19}_0
c  in DIMACS:
-8480 -8481  8482 -90  8483 0
-8480 -8481  8482 -90 -8484 0
-8480 -8481  8482 -90  8485 0

c  -1+1 --> 0
c    ( b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0 ∧  p_90) -> (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧ -b^{5, 19}_0)
c  in CNF:
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_2
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_1
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_0
c  in DIMACS:
-8480  8481 -8482 -90 -8483 0
-8480  8481 -8482 -90 -8484 0
-8480  8481 -8482 -90 -8485 0

c  0+1 --> 1
c    (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧  p_90) -> (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0)
c  in CNF:
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_2
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_1
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨  b^{5, 19}_0
c  in DIMACS:
 8480  8481  8482 -90 -8483 0
 8480  8481  8482 -90 -8484 0
 8480  8481  8482 -90  8485 0

c  1+1 --> 2
c    (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0 ∧  p_90) -> (-b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0)
c  in CNF:
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_2
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨  b^{5, 19}_1
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ -p_90 ∨ -b^{5, 19}_0
c  in DIMACS:
 8480  8481 -8482 -90 -8483 0
 8480  8481 -8482 -90  8484 0
 8480  8481 -8482 -90 -8485 0

c  2+1 --> break 
c    (-b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧  p_90) -> break
c  in CNF:
c     b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 8480 -8481  8482 -90 1162 0


c  2-1 --> 1
c    (-b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧ -p_90) -> (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0)
c  in CNF:
c     b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_2
c     b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_1
c     b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨  b^{5, 19}_0
c  in DIMACS:
 8480 -8481  8482  90 -8483 0
 8480 -8481  8482  90 -8484 0
 8480 -8481  8482  90  8485 0

c  1-1 --> 0
c    (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0 ∧ -p_90) -> (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧ -b^{5, 19}_0)
c  in CNF:
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_2
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_1
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_0
c  in DIMACS:
 8480  8481 -8482  90 -8483 0
 8480  8481 -8482  90 -8484 0
 8480  8481 -8482  90 -8485 0

c  0-1 --> -1
c    (-b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧ -p_90) -> ( b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0)
c  in CNF:
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨  b^{5, 19}_2
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_1
c     b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨  b^{5, 19}_0
c  in DIMACS:
 8480  8481  8482  90  8483 0
 8480  8481  8482  90 -8484 0
 8480  8481  8482  90  8485 0

c  -1-1 --> -2
c    ( b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧  b^{5, 18}_0 ∧ -p_90) -> ( b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0)
c  in CNF:
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨  b^{5, 19}_2
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨  b^{5, 19}_1
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨  p_90 ∨ -b^{5, 19}_0
c  in DIMACS:
-8480  8481 -8482  90  8483 0
-8480  8481 -8482  90  8484 0
-8480  8481 -8482  90 -8485 0

c  -2-1 --> break 
c    ( b^{5, 18}_2 ∧  b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨  b^{5, 18}_0 ∨  p_90 ∨ break
c  in DIMACS:
-8480 -8481  8482  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 18}_2 ∧ -b^{5, 18}_1 ∧ -b^{5, 18}_0 ∧ true) 
c  in CNF:
c    -b^{5, 18}_2 ∨  b^{5, 18}_1 ∨  b^{5, 18}_0 ∨ false 
c  in DIMACS:
-8480  8481  8482  0

c  3 does not represent an automaton state.
c    -(-b^{5, 18}_2 ∧  b^{5, 18}_1 ∧  b^{5, 18}_0 ∧ true) 
c  in CNF:
c     b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ false 
c  in DIMACS:
 8480 -8481 -8482  0
c  -3 does not represent an automaton state.
c    -( b^{5, 18}_2 ∧  b^{5, 18}_1 ∧  b^{5, 18}_0 ∧ true) 
c  in CNF:
c    -b^{5, 18}_2 ∨ -b^{5, 18}_1 ∨ -b^{5, 18}_0 ∨ false 
c  in DIMACS:
-8480 -8481 -8482  0

c i = 19
c  -2+1 --> -1
c    ( b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧  p_95) -> ( b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0)
c  in CNF:
c    -b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨  b^{5, 20}_2
c    -b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_1
c    -b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨  b^{5, 20}_0
c  in DIMACS:
-8483 -8484  8485 -95  8486 0
-8483 -8484  8485 -95 -8487 0
-8483 -8484  8485 -95  8488 0

c  -1+1 --> 0
c    ( b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0 ∧  p_95) -> (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧ -b^{5, 20}_0)
c  in CNF:
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_2
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_1
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_0
c  in DIMACS:
-8483  8484 -8485 -95 -8486 0
-8483  8484 -8485 -95 -8487 0
-8483  8484 -8485 -95 -8488 0

c  0+1 --> 1
c    (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧  p_95) -> (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0)
c  in CNF:
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_2
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_1
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨  b^{5, 20}_0
c  in DIMACS:
 8483  8484  8485 -95 -8486 0
 8483  8484  8485 -95 -8487 0
 8483  8484  8485 -95  8488 0

c  1+1 --> 2
c    (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0 ∧  p_95) -> (-b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0)
c  in CNF:
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_2
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨  b^{5, 20}_1
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ -p_95 ∨ -b^{5, 20}_0
c  in DIMACS:
 8483  8484 -8485 -95 -8486 0
 8483  8484 -8485 -95  8487 0
 8483  8484 -8485 -95 -8488 0

c  2+1 --> break 
c    (-b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧  p_95) -> break
c  in CNF:
c     b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ -p_95 ∨ break
c  in DIMACS:
 8483 -8484  8485 -95 1162 0


c  2-1 --> 1
c    (-b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧ -p_95) -> (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0)
c  in CNF:
c     b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_2
c     b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_1
c     b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨  b^{5, 20}_0
c  in DIMACS:
 8483 -8484  8485  95 -8486 0
 8483 -8484  8485  95 -8487 0
 8483 -8484  8485  95  8488 0

c  1-1 --> 0
c    (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0 ∧ -p_95) -> (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧ -b^{5, 20}_0)
c  in CNF:
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_2
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_1
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_0
c  in DIMACS:
 8483  8484 -8485  95 -8486 0
 8483  8484 -8485  95 -8487 0
 8483  8484 -8485  95 -8488 0

c  0-1 --> -1
c    (-b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧ -p_95) -> ( b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0)
c  in CNF:
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨  b^{5, 20}_2
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_1
c     b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨  b^{5, 20}_0
c  in DIMACS:
 8483  8484  8485  95  8486 0
 8483  8484  8485  95 -8487 0
 8483  8484  8485  95  8488 0

c  -1-1 --> -2
c    ( b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧  b^{5, 19}_0 ∧ -p_95) -> ( b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0)
c  in CNF:
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨  b^{5, 20}_2
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨  b^{5, 20}_1
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨  p_95 ∨ -b^{5, 20}_0
c  in DIMACS:
-8483  8484 -8485  95  8486 0
-8483  8484 -8485  95  8487 0
-8483  8484 -8485  95 -8488 0

c  -2-1 --> break 
c    ( b^{5, 19}_2 ∧  b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧ -p_95) -> break
c  in CNF:
c    -b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨  b^{5, 19}_0 ∨  p_95 ∨ break
c  in DIMACS:
-8483 -8484  8485  95 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 19}_2 ∧ -b^{5, 19}_1 ∧ -b^{5, 19}_0 ∧ true) 
c  in CNF:
c    -b^{5, 19}_2 ∨  b^{5, 19}_1 ∨  b^{5, 19}_0 ∨ false 
c  in DIMACS:
-8483  8484  8485  0

c  3 does not represent an automaton state.
c    -(-b^{5, 19}_2 ∧  b^{5, 19}_1 ∧  b^{5, 19}_0 ∧ true) 
c  in CNF:
c     b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ false 
c  in DIMACS:
 8483 -8484 -8485  0
c  -3 does not represent an automaton state.
c    -( b^{5, 19}_2 ∧  b^{5, 19}_1 ∧  b^{5, 19}_0 ∧ true) 
c  in CNF:
c    -b^{5, 19}_2 ∨ -b^{5, 19}_1 ∨ -b^{5, 19}_0 ∨ false 
c  in DIMACS:
-8483 -8484 -8485  0

c i = 20
c  -2+1 --> -1
c    ( b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧  p_100) -> ( b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0)
c  in CNF:
c    -b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨  b^{5, 21}_2
c    -b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_1
c    -b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨  b^{5, 21}_0
c  in DIMACS:
-8486 -8487  8488 -100  8489 0
-8486 -8487  8488 -100 -8490 0
-8486 -8487  8488 -100  8491 0

c  -1+1 --> 0
c    ( b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0 ∧  p_100) -> (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧ -b^{5, 21}_0)
c  in CNF:
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_2
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_1
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_0
c  in DIMACS:
-8486  8487 -8488 -100 -8489 0
-8486  8487 -8488 -100 -8490 0
-8486  8487 -8488 -100 -8491 0

c  0+1 --> 1
c    (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧  p_100) -> (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0)
c  in CNF:
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_2
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_1
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨  b^{5, 21}_0
c  in DIMACS:
 8486  8487  8488 -100 -8489 0
 8486  8487  8488 -100 -8490 0
 8486  8487  8488 -100  8491 0

c  1+1 --> 2
c    (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0 ∧  p_100) -> (-b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0)
c  in CNF:
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_2
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨  b^{5, 21}_1
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ -p_100 ∨ -b^{5, 21}_0
c  in DIMACS:
 8486  8487 -8488 -100 -8489 0
 8486  8487 -8488 -100  8490 0
 8486  8487 -8488 -100 -8491 0

c  2+1 --> break 
c    (-b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧  p_100) -> break
c  in CNF:
c     b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 8486 -8487  8488 -100 1162 0


c  2-1 --> 1
c    (-b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧ -p_100) -> (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0)
c  in CNF:
c     b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_2
c     b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_1
c     b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨  b^{5, 21}_0
c  in DIMACS:
 8486 -8487  8488  100 -8489 0
 8486 -8487  8488  100 -8490 0
 8486 -8487  8488  100  8491 0

c  1-1 --> 0
c    (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0 ∧ -p_100) -> (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧ -b^{5, 21}_0)
c  in CNF:
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_2
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_1
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_0
c  in DIMACS:
 8486  8487 -8488  100 -8489 0
 8486  8487 -8488  100 -8490 0
 8486  8487 -8488  100 -8491 0

c  0-1 --> -1
c    (-b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧ -p_100) -> ( b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0)
c  in CNF:
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨  b^{5, 21}_2
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_1
c     b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨  b^{5, 21}_0
c  in DIMACS:
 8486  8487  8488  100  8489 0
 8486  8487  8488  100 -8490 0
 8486  8487  8488  100  8491 0

c  -1-1 --> -2
c    ( b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧  b^{5, 20}_0 ∧ -p_100) -> ( b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0)
c  in CNF:
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨  b^{5, 21}_2
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨  b^{5, 21}_1
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨  p_100 ∨ -b^{5, 21}_0
c  in DIMACS:
-8486  8487 -8488  100  8489 0
-8486  8487 -8488  100  8490 0
-8486  8487 -8488  100 -8491 0

c  -2-1 --> break 
c    ( b^{5, 20}_2 ∧  b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨  b^{5, 20}_0 ∨  p_100 ∨ break
c  in DIMACS:
-8486 -8487  8488  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 20}_2 ∧ -b^{5, 20}_1 ∧ -b^{5, 20}_0 ∧ true) 
c  in CNF:
c    -b^{5, 20}_2 ∨  b^{5, 20}_1 ∨  b^{5, 20}_0 ∨ false 
c  in DIMACS:
-8486  8487  8488  0

c  3 does not represent an automaton state.
c    -(-b^{5, 20}_2 ∧  b^{5, 20}_1 ∧  b^{5, 20}_0 ∧ true) 
c  in CNF:
c     b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ false 
c  in DIMACS:
 8486 -8487 -8488  0
c  -3 does not represent an automaton state.
c    -( b^{5, 20}_2 ∧  b^{5, 20}_1 ∧  b^{5, 20}_0 ∧ true) 
c  in CNF:
c    -b^{5, 20}_2 ∨ -b^{5, 20}_1 ∨ -b^{5, 20}_0 ∨ false 
c  in DIMACS:
-8486 -8487 -8488  0

c i = 21
c  -2+1 --> -1
c    ( b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧  p_105) -> ( b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0)
c  in CNF:
c    -b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨  b^{5, 22}_2
c    -b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_1
c    -b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨  b^{5, 22}_0
c  in DIMACS:
-8489 -8490  8491 -105  8492 0
-8489 -8490  8491 -105 -8493 0
-8489 -8490  8491 -105  8494 0

c  -1+1 --> 0
c    ( b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0 ∧  p_105) -> (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧ -b^{5, 22}_0)
c  in CNF:
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_2
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_1
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_0
c  in DIMACS:
-8489  8490 -8491 -105 -8492 0
-8489  8490 -8491 -105 -8493 0
-8489  8490 -8491 -105 -8494 0

c  0+1 --> 1
c    (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧  p_105) -> (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0)
c  in CNF:
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_2
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_1
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨  b^{5, 22}_0
c  in DIMACS:
 8489  8490  8491 -105 -8492 0
 8489  8490  8491 -105 -8493 0
 8489  8490  8491 -105  8494 0

c  1+1 --> 2
c    (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0 ∧  p_105) -> (-b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0)
c  in CNF:
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_2
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨  b^{5, 22}_1
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ -p_105 ∨ -b^{5, 22}_0
c  in DIMACS:
 8489  8490 -8491 -105 -8492 0
 8489  8490 -8491 -105  8493 0
 8489  8490 -8491 -105 -8494 0

c  2+1 --> break 
c    (-b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧  p_105) -> break
c  in CNF:
c     b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 8489 -8490  8491 -105 1162 0


c  2-1 --> 1
c    (-b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧ -p_105) -> (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0)
c  in CNF:
c     b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_2
c     b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_1
c     b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨  b^{5, 22}_0
c  in DIMACS:
 8489 -8490  8491  105 -8492 0
 8489 -8490  8491  105 -8493 0
 8489 -8490  8491  105  8494 0

c  1-1 --> 0
c    (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0 ∧ -p_105) -> (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧ -b^{5, 22}_0)
c  in CNF:
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_2
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_1
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_0
c  in DIMACS:
 8489  8490 -8491  105 -8492 0
 8489  8490 -8491  105 -8493 0
 8489  8490 -8491  105 -8494 0

c  0-1 --> -1
c    (-b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧ -p_105) -> ( b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0)
c  in CNF:
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨  b^{5, 22}_2
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_1
c     b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨  b^{5, 22}_0
c  in DIMACS:
 8489  8490  8491  105  8492 0
 8489  8490  8491  105 -8493 0
 8489  8490  8491  105  8494 0

c  -1-1 --> -2
c    ( b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧  b^{5, 21}_0 ∧ -p_105) -> ( b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0)
c  in CNF:
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨  b^{5, 22}_2
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨  b^{5, 22}_1
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨  p_105 ∨ -b^{5, 22}_0
c  in DIMACS:
-8489  8490 -8491  105  8492 0
-8489  8490 -8491  105  8493 0
-8489  8490 -8491  105 -8494 0

c  -2-1 --> break 
c    ( b^{5, 21}_2 ∧  b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨  b^{5, 21}_0 ∨  p_105 ∨ break
c  in DIMACS:
-8489 -8490  8491  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 21}_2 ∧ -b^{5, 21}_1 ∧ -b^{5, 21}_0 ∧ true) 
c  in CNF:
c    -b^{5, 21}_2 ∨  b^{5, 21}_1 ∨  b^{5, 21}_0 ∨ false 
c  in DIMACS:
-8489  8490  8491  0

c  3 does not represent an automaton state.
c    -(-b^{5, 21}_2 ∧  b^{5, 21}_1 ∧  b^{5, 21}_0 ∧ true) 
c  in CNF:
c     b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ false 
c  in DIMACS:
 8489 -8490 -8491  0
c  -3 does not represent an automaton state.
c    -( b^{5, 21}_2 ∧  b^{5, 21}_1 ∧  b^{5, 21}_0 ∧ true) 
c  in CNF:
c    -b^{5, 21}_2 ∨ -b^{5, 21}_1 ∨ -b^{5, 21}_0 ∨ false 
c  in DIMACS:
-8489 -8490 -8491  0

c i = 22
c  -2+1 --> -1
c    ( b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧  p_110) -> ( b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0)
c  in CNF:
c    -b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨  b^{5, 23}_2
c    -b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_1
c    -b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨  b^{5, 23}_0
c  in DIMACS:
-8492 -8493  8494 -110  8495 0
-8492 -8493  8494 -110 -8496 0
-8492 -8493  8494 -110  8497 0

c  -1+1 --> 0
c    ( b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0 ∧  p_110) -> (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧ -b^{5, 23}_0)
c  in CNF:
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_2
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_1
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_0
c  in DIMACS:
-8492  8493 -8494 -110 -8495 0
-8492  8493 -8494 -110 -8496 0
-8492  8493 -8494 -110 -8497 0

c  0+1 --> 1
c    (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧  p_110) -> (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0)
c  in CNF:
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_2
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_1
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨  b^{5, 23}_0
c  in DIMACS:
 8492  8493  8494 -110 -8495 0
 8492  8493  8494 -110 -8496 0
 8492  8493  8494 -110  8497 0

c  1+1 --> 2
c    (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0 ∧  p_110) -> (-b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0)
c  in CNF:
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_2
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨  b^{5, 23}_1
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ -p_110 ∨ -b^{5, 23}_0
c  in DIMACS:
 8492  8493 -8494 -110 -8495 0
 8492  8493 -8494 -110  8496 0
 8492  8493 -8494 -110 -8497 0

c  2+1 --> break 
c    (-b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧  p_110) -> break
c  in CNF:
c     b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 8492 -8493  8494 -110 1162 0


c  2-1 --> 1
c    (-b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧ -p_110) -> (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0)
c  in CNF:
c     b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_2
c     b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_1
c     b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨  b^{5, 23}_0
c  in DIMACS:
 8492 -8493  8494  110 -8495 0
 8492 -8493  8494  110 -8496 0
 8492 -8493  8494  110  8497 0

c  1-1 --> 0
c    (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0 ∧ -p_110) -> (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧ -b^{5, 23}_0)
c  in CNF:
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_2
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_1
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_0
c  in DIMACS:
 8492  8493 -8494  110 -8495 0
 8492  8493 -8494  110 -8496 0
 8492  8493 -8494  110 -8497 0

c  0-1 --> -1
c    (-b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧ -p_110) -> ( b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0)
c  in CNF:
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨  b^{5, 23}_2
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_1
c     b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨  b^{5, 23}_0
c  in DIMACS:
 8492  8493  8494  110  8495 0
 8492  8493  8494  110 -8496 0
 8492  8493  8494  110  8497 0

c  -1-1 --> -2
c    ( b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧  b^{5, 22}_0 ∧ -p_110) -> ( b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0)
c  in CNF:
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨  b^{5, 23}_2
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨  b^{5, 23}_1
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨  p_110 ∨ -b^{5, 23}_0
c  in DIMACS:
-8492  8493 -8494  110  8495 0
-8492  8493 -8494  110  8496 0
-8492  8493 -8494  110 -8497 0

c  -2-1 --> break 
c    ( b^{5, 22}_2 ∧  b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨  b^{5, 22}_0 ∨  p_110 ∨ break
c  in DIMACS:
-8492 -8493  8494  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 22}_2 ∧ -b^{5, 22}_1 ∧ -b^{5, 22}_0 ∧ true) 
c  in CNF:
c    -b^{5, 22}_2 ∨  b^{5, 22}_1 ∨  b^{5, 22}_0 ∨ false 
c  in DIMACS:
-8492  8493  8494  0

c  3 does not represent an automaton state.
c    -(-b^{5, 22}_2 ∧  b^{5, 22}_1 ∧  b^{5, 22}_0 ∧ true) 
c  in CNF:
c     b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ false 
c  in DIMACS:
 8492 -8493 -8494  0
c  -3 does not represent an automaton state.
c    -( b^{5, 22}_2 ∧  b^{5, 22}_1 ∧  b^{5, 22}_0 ∧ true) 
c  in CNF:
c    -b^{5, 22}_2 ∨ -b^{5, 22}_1 ∨ -b^{5, 22}_0 ∨ false 
c  in DIMACS:
-8492 -8493 -8494  0

c i = 23
c  -2+1 --> -1
c    ( b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧  p_115) -> ( b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0)
c  in CNF:
c    -b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨  b^{5, 24}_2
c    -b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_1
c    -b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨  b^{5, 24}_0
c  in DIMACS:
-8495 -8496  8497 -115  8498 0
-8495 -8496  8497 -115 -8499 0
-8495 -8496  8497 -115  8500 0

c  -1+1 --> 0
c    ( b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0 ∧  p_115) -> (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧ -b^{5, 24}_0)
c  in CNF:
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_2
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_1
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_0
c  in DIMACS:
-8495  8496 -8497 -115 -8498 0
-8495  8496 -8497 -115 -8499 0
-8495  8496 -8497 -115 -8500 0

c  0+1 --> 1
c    (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧  p_115) -> (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0)
c  in CNF:
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_2
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_1
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨  b^{5, 24}_0
c  in DIMACS:
 8495  8496  8497 -115 -8498 0
 8495  8496  8497 -115 -8499 0
 8495  8496  8497 -115  8500 0

c  1+1 --> 2
c    (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0 ∧  p_115) -> (-b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0)
c  in CNF:
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_2
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨  b^{5, 24}_1
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ -p_115 ∨ -b^{5, 24}_0
c  in DIMACS:
 8495  8496 -8497 -115 -8498 0
 8495  8496 -8497 -115  8499 0
 8495  8496 -8497 -115 -8500 0

c  2+1 --> break 
c    (-b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧  p_115) -> break
c  in CNF:
c     b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ -p_115 ∨ break
c  in DIMACS:
 8495 -8496  8497 -115 1162 0


c  2-1 --> 1
c    (-b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧ -p_115) -> (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0)
c  in CNF:
c     b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_2
c     b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_1
c     b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨  b^{5, 24}_0
c  in DIMACS:
 8495 -8496  8497  115 -8498 0
 8495 -8496  8497  115 -8499 0
 8495 -8496  8497  115  8500 0

c  1-1 --> 0
c    (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0 ∧ -p_115) -> (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧ -b^{5, 24}_0)
c  in CNF:
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_2
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_1
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_0
c  in DIMACS:
 8495  8496 -8497  115 -8498 0
 8495  8496 -8497  115 -8499 0
 8495  8496 -8497  115 -8500 0

c  0-1 --> -1
c    (-b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧ -p_115) -> ( b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0)
c  in CNF:
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨  b^{5, 24}_2
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_1
c     b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨  b^{5, 24}_0
c  in DIMACS:
 8495  8496  8497  115  8498 0
 8495  8496  8497  115 -8499 0
 8495  8496  8497  115  8500 0

c  -1-1 --> -2
c    ( b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧  b^{5, 23}_0 ∧ -p_115) -> ( b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0)
c  in CNF:
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨  b^{5, 24}_2
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨  b^{5, 24}_1
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨  p_115 ∨ -b^{5, 24}_0
c  in DIMACS:
-8495  8496 -8497  115  8498 0
-8495  8496 -8497  115  8499 0
-8495  8496 -8497  115 -8500 0

c  -2-1 --> break 
c    ( b^{5, 23}_2 ∧  b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧ -p_115) -> break
c  in CNF:
c    -b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨  b^{5, 23}_0 ∨  p_115 ∨ break
c  in DIMACS:
-8495 -8496  8497  115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 23}_2 ∧ -b^{5, 23}_1 ∧ -b^{5, 23}_0 ∧ true) 
c  in CNF:
c    -b^{5, 23}_2 ∨  b^{5, 23}_1 ∨  b^{5, 23}_0 ∨ false 
c  in DIMACS:
-8495  8496  8497  0

c  3 does not represent an automaton state.
c    -(-b^{5, 23}_2 ∧  b^{5, 23}_1 ∧  b^{5, 23}_0 ∧ true) 
c  in CNF:
c     b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ false 
c  in DIMACS:
 8495 -8496 -8497  0
c  -3 does not represent an automaton state.
c    -( b^{5, 23}_2 ∧  b^{5, 23}_1 ∧  b^{5, 23}_0 ∧ true) 
c  in CNF:
c    -b^{5, 23}_2 ∨ -b^{5, 23}_1 ∨ -b^{5, 23}_0 ∨ false 
c  in DIMACS:
-8495 -8496 -8497  0

c i = 24
c  -2+1 --> -1
c    ( b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧  p_120) -> ( b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0)
c  in CNF:
c    -b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨  b^{5, 25}_2
c    -b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_1
c    -b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨  b^{5, 25}_0
c  in DIMACS:
-8498 -8499  8500 -120  8501 0
-8498 -8499  8500 -120 -8502 0
-8498 -8499  8500 -120  8503 0

c  -1+1 --> 0
c    ( b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0 ∧  p_120) -> (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧ -b^{5, 25}_0)
c  in CNF:
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_2
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_1
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_0
c  in DIMACS:
-8498  8499 -8500 -120 -8501 0
-8498  8499 -8500 -120 -8502 0
-8498  8499 -8500 -120 -8503 0

c  0+1 --> 1
c    (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧  p_120) -> (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0)
c  in CNF:
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_2
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_1
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨  b^{5, 25}_0
c  in DIMACS:
 8498  8499  8500 -120 -8501 0
 8498  8499  8500 -120 -8502 0
 8498  8499  8500 -120  8503 0

c  1+1 --> 2
c    (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0 ∧  p_120) -> (-b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0)
c  in CNF:
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_2
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨  b^{5, 25}_1
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ -p_120 ∨ -b^{5, 25}_0
c  in DIMACS:
 8498  8499 -8500 -120 -8501 0
 8498  8499 -8500 -120  8502 0
 8498  8499 -8500 -120 -8503 0

c  2+1 --> break 
c    (-b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧  p_120) -> break
c  in CNF:
c     b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 8498 -8499  8500 -120 1162 0


c  2-1 --> 1
c    (-b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧ -p_120) -> (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0)
c  in CNF:
c     b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_2
c     b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_1
c     b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨  b^{5, 25}_0
c  in DIMACS:
 8498 -8499  8500  120 -8501 0
 8498 -8499  8500  120 -8502 0
 8498 -8499  8500  120  8503 0

c  1-1 --> 0
c    (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0 ∧ -p_120) -> (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧ -b^{5, 25}_0)
c  in CNF:
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_2
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_1
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_0
c  in DIMACS:
 8498  8499 -8500  120 -8501 0
 8498  8499 -8500  120 -8502 0
 8498  8499 -8500  120 -8503 0

c  0-1 --> -1
c    (-b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧ -p_120) -> ( b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0)
c  in CNF:
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨  b^{5, 25}_2
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_1
c     b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨  b^{5, 25}_0
c  in DIMACS:
 8498  8499  8500  120  8501 0
 8498  8499  8500  120 -8502 0
 8498  8499  8500  120  8503 0

c  -1-1 --> -2
c    ( b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧  b^{5, 24}_0 ∧ -p_120) -> ( b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0)
c  in CNF:
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨  b^{5, 25}_2
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨  b^{5, 25}_1
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨  p_120 ∨ -b^{5, 25}_0
c  in DIMACS:
-8498  8499 -8500  120  8501 0
-8498  8499 -8500  120  8502 0
-8498  8499 -8500  120 -8503 0

c  -2-1 --> break 
c    ( b^{5, 24}_2 ∧  b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨  b^{5, 24}_0 ∨  p_120 ∨ break
c  in DIMACS:
-8498 -8499  8500  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 24}_2 ∧ -b^{5, 24}_1 ∧ -b^{5, 24}_0 ∧ true) 
c  in CNF:
c    -b^{5, 24}_2 ∨  b^{5, 24}_1 ∨  b^{5, 24}_0 ∨ false 
c  in DIMACS:
-8498  8499  8500  0

c  3 does not represent an automaton state.
c    -(-b^{5, 24}_2 ∧  b^{5, 24}_1 ∧  b^{5, 24}_0 ∧ true) 
c  in CNF:
c     b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ false 
c  in DIMACS:
 8498 -8499 -8500  0
c  -3 does not represent an automaton state.
c    -( b^{5, 24}_2 ∧  b^{5, 24}_1 ∧  b^{5, 24}_0 ∧ true) 
c  in CNF:
c    -b^{5, 24}_2 ∨ -b^{5, 24}_1 ∨ -b^{5, 24}_0 ∨ false 
c  in DIMACS:
-8498 -8499 -8500  0

c i = 25
c  -2+1 --> -1
c    ( b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧  p_125) -> ( b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0)
c  in CNF:
c    -b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨  b^{5, 26}_2
c    -b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_1
c    -b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨  b^{5, 26}_0
c  in DIMACS:
-8501 -8502  8503 -125  8504 0
-8501 -8502  8503 -125 -8505 0
-8501 -8502  8503 -125  8506 0

c  -1+1 --> 0
c    ( b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0 ∧  p_125) -> (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧ -b^{5, 26}_0)
c  in CNF:
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_2
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_1
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_0
c  in DIMACS:
-8501  8502 -8503 -125 -8504 0
-8501  8502 -8503 -125 -8505 0
-8501  8502 -8503 -125 -8506 0

c  0+1 --> 1
c    (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧  p_125) -> (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0)
c  in CNF:
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_2
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_1
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨  b^{5, 26}_0
c  in DIMACS:
 8501  8502  8503 -125 -8504 0
 8501  8502  8503 -125 -8505 0
 8501  8502  8503 -125  8506 0

c  1+1 --> 2
c    (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0 ∧  p_125) -> (-b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0)
c  in CNF:
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_2
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨  b^{5, 26}_1
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ -p_125 ∨ -b^{5, 26}_0
c  in DIMACS:
 8501  8502 -8503 -125 -8504 0
 8501  8502 -8503 -125  8505 0
 8501  8502 -8503 -125 -8506 0

c  2+1 --> break 
c    (-b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧  p_125) -> break
c  in CNF:
c     b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ -p_125 ∨ break
c  in DIMACS:
 8501 -8502  8503 -125 1162 0


c  2-1 --> 1
c    (-b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧ -p_125) -> (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0)
c  in CNF:
c     b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_2
c     b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_1
c     b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨  b^{5, 26}_0
c  in DIMACS:
 8501 -8502  8503  125 -8504 0
 8501 -8502  8503  125 -8505 0
 8501 -8502  8503  125  8506 0

c  1-1 --> 0
c    (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0 ∧ -p_125) -> (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧ -b^{5, 26}_0)
c  in CNF:
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_2
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_1
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_0
c  in DIMACS:
 8501  8502 -8503  125 -8504 0
 8501  8502 -8503  125 -8505 0
 8501  8502 -8503  125 -8506 0

c  0-1 --> -1
c    (-b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧ -p_125) -> ( b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0)
c  in CNF:
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨  b^{5, 26}_2
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_1
c     b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨  b^{5, 26}_0
c  in DIMACS:
 8501  8502  8503  125  8504 0
 8501  8502  8503  125 -8505 0
 8501  8502  8503  125  8506 0

c  -1-1 --> -2
c    ( b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧  b^{5, 25}_0 ∧ -p_125) -> ( b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0)
c  in CNF:
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨  b^{5, 26}_2
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨  b^{5, 26}_1
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨  p_125 ∨ -b^{5, 26}_0
c  in DIMACS:
-8501  8502 -8503  125  8504 0
-8501  8502 -8503  125  8505 0
-8501  8502 -8503  125 -8506 0

c  -2-1 --> break 
c    ( b^{5, 25}_2 ∧  b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧ -p_125) -> break
c  in CNF:
c    -b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨  b^{5, 25}_0 ∨  p_125 ∨ break
c  in DIMACS:
-8501 -8502  8503  125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 25}_2 ∧ -b^{5, 25}_1 ∧ -b^{5, 25}_0 ∧ true) 
c  in CNF:
c    -b^{5, 25}_2 ∨  b^{5, 25}_1 ∨  b^{5, 25}_0 ∨ false 
c  in DIMACS:
-8501  8502  8503  0

c  3 does not represent an automaton state.
c    -(-b^{5, 25}_2 ∧  b^{5, 25}_1 ∧  b^{5, 25}_0 ∧ true) 
c  in CNF:
c     b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ false 
c  in DIMACS:
 8501 -8502 -8503  0
c  -3 does not represent an automaton state.
c    -( b^{5, 25}_2 ∧  b^{5, 25}_1 ∧  b^{5, 25}_0 ∧ true) 
c  in CNF:
c    -b^{5, 25}_2 ∨ -b^{5, 25}_1 ∨ -b^{5, 25}_0 ∨ false 
c  in DIMACS:
-8501 -8502 -8503  0

c i = 26
c  -2+1 --> -1
c    ( b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧  p_130) -> ( b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0)
c  in CNF:
c    -b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨  b^{5, 27}_2
c    -b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_1
c    -b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨  b^{5, 27}_0
c  in DIMACS:
-8504 -8505  8506 -130  8507 0
-8504 -8505  8506 -130 -8508 0
-8504 -8505  8506 -130  8509 0

c  -1+1 --> 0
c    ( b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0 ∧  p_130) -> (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧ -b^{5, 27}_0)
c  in CNF:
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_2
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_1
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_0
c  in DIMACS:
-8504  8505 -8506 -130 -8507 0
-8504  8505 -8506 -130 -8508 0
-8504  8505 -8506 -130 -8509 0

c  0+1 --> 1
c    (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧  p_130) -> (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0)
c  in CNF:
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_2
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_1
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨  b^{5, 27}_0
c  in DIMACS:
 8504  8505  8506 -130 -8507 0
 8504  8505  8506 -130 -8508 0
 8504  8505  8506 -130  8509 0

c  1+1 --> 2
c    (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0 ∧  p_130) -> (-b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0)
c  in CNF:
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_2
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨  b^{5, 27}_1
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ -p_130 ∨ -b^{5, 27}_0
c  in DIMACS:
 8504  8505 -8506 -130 -8507 0
 8504  8505 -8506 -130  8508 0
 8504  8505 -8506 -130 -8509 0

c  2+1 --> break 
c    (-b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧  p_130) -> break
c  in CNF:
c     b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 8504 -8505  8506 -130 1162 0


c  2-1 --> 1
c    (-b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧ -p_130) -> (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0)
c  in CNF:
c     b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_2
c     b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_1
c     b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨  b^{5, 27}_0
c  in DIMACS:
 8504 -8505  8506  130 -8507 0
 8504 -8505  8506  130 -8508 0
 8504 -8505  8506  130  8509 0

c  1-1 --> 0
c    (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0 ∧ -p_130) -> (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧ -b^{5, 27}_0)
c  in CNF:
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_2
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_1
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_0
c  in DIMACS:
 8504  8505 -8506  130 -8507 0
 8504  8505 -8506  130 -8508 0
 8504  8505 -8506  130 -8509 0

c  0-1 --> -1
c    (-b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧ -p_130) -> ( b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0)
c  in CNF:
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨  b^{5, 27}_2
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_1
c     b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨  b^{5, 27}_0
c  in DIMACS:
 8504  8505  8506  130  8507 0
 8504  8505  8506  130 -8508 0
 8504  8505  8506  130  8509 0

c  -1-1 --> -2
c    ( b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧  b^{5, 26}_0 ∧ -p_130) -> ( b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0)
c  in CNF:
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨  b^{5, 27}_2
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨  b^{5, 27}_1
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨  p_130 ∨ -b^{5, 27}_0
c  in DIMACS:
-8504  8505 -8506  130  8507 0
-8504  8505 -8506  130  8508 0
-8504  8505 -8506  130 -8509 0

c  -2-1 --> break 
c    ( b^{5, 26}_2 ∧  b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨  b^{5, 26}_0 ∨  p_130 ∨ break
c  in DIMACS:
-8504 -8505  8506  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 26}_2 ∧ -b^{5, 26}_1 ∧ -b^{5, 26}_0 ∧ true) 
c  in CNF:
c    -b^{5, 26}_2 ∨  b^{5, 26}_1 ∨  b^{5, 26}_0 ∨ false 
c  in DIMACS:
-8504  8505  8506  0

c  3 does not represent an automaton state.
c    -(-b^{5, 26}_2 ∧  b^{5, 26}_1 ∧  b^{5, 26}_0 ∧ true) 
c  in CNF:
c     b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ false 
c  in DIMACS:
 8504 -8505 -8506  0
c  -3 does not represent an automaton state.
c    -( b^{5, 26}_2 ∧  b^{5, 26}_1 ∧  b^{5, 26}_0 ∧ true) 
c  in CNF:
c    -b^{5, 26}_2 ∨ -b^{5, 26}_1 ∨ -b^{5, 26}_0 ∨ false 
c  in DIMACS:
-8504 -8505 -8506  0

c i = 27
c  -2+1 --> -1
c    ( b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧  p_135) -> ( b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0)
c  in CNF:
c    -b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨  b^{5, 28}_2
c    -b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_1
c    -b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨  b^{5, 28}_0
c  in DIMACS:
-8507 -8508  8509 -135  8510 0
-8507 -8508  8509 -135 -8511 0
-8507 -8508  8509 -135  8512 0

c  -1+1 --> 0
c    ( b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0 ∧  p_135) -> (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧ -b^{5, 28}_0)
c  in CNF:
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_2
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_1
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_0
c  in DIMACS:
-8507  8508 -8509 -135 -8510 0
-8507  8508 -8509 -135 -8511 0
-8507  8508 -8509 -135 -8512 0

c  0+1 --> 1
c    (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧  p_135) -> (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0)
c  in CNF:
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_2
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_1
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨  b^{5, 28}_0
c  in DIMACS:
 8507  8508  8509 -135 -8510 0
 8507  8508  8509 -135 -8511 0
 8507  8508  8509 -135  8512 0

c  1+1 --> 2
c    (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0 ∧  p_135) -> (-b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0)
c  in CNF:
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_2
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨  b^{5, 28}_1
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ -p_135 ∨ -b^{5, 28}_0
c  in DIMACS:
 8507  8508 -8509 -135 -8510 0
 8507  8508 -8509 -135  8511 0
 8507  8508 -8509 -135 -8512 0

c  2+1 --> break 
c    (-b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧  p_135) -> break
c  in CNF:
c     b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 8507 -8508  8509 -135 1162 0


c  2-1 --> 1
c    (-b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧ -p_135) -> (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0)
c  in CNF:
c     b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_2
c     b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_1
c     b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨  b^{5, 28}_0
c  in DIMACS:
 8507 -8508  8509  135 -8510 0
 8507 -8508  8509  135 -8511 0
 8507 -8508  8509  135  8512 0

c  1-1 --> 0
c    (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0 ∧ -p_135) -> (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧ -b^{5, 28}_0)
c  in CNF:
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_2
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_1
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_0
c  in DIMACS:
 8507  8508 -8509  135 -8510 0
 8507  8508 -8509  135 -8511 0
 8507  8508 -8509  135 -8512 0

c  0-1 --> -1
c    (-b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧ -p_135) -> ( b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0)
c  in CNF:
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨  b^{5, 28}_2
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_1
c     b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨  b^{5, 28}_0
c  in DIMACS:
 8507  8508  8509  135  8510 0
 8507  8508  8509  135 -8511 0
 8507  8508  8509  135  8512 0

c  -1-1 --> -2
c    ( b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧  b^{5, 27}_0 ∧ -p_135) -> ( b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0)
c  in CNF:
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨  b^{5, 28}_2
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨  b^{5, 28}_1
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨  p_135 ∨ -b^{5, 28}_0
c  in DIMACS:
-8507  8508 -8509  135  8510 0
-8507  8508 -8509  135  8511 0
-8507  8508 -8509  135 -8512 0

c  -2-1 --> break 
c    ( b^{5, 27}_2 ∧  b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨  b^{5, 27}_0 ∨  p_135 ∨ break
c  in DIMACS:
-8507 -8508  8509  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 27}_2 ∧ -b^{5, 27}_1 ∧ -b^{5, 27}_0 ∧ true) 
c  in CNF:
c    -b^{5, 27}_2 ∨  b^{5, 27}_1 ∨  b^{5, 27}_0 ∨ false 
c  in DIMACS:
-8507  8508  8509  0

c  3 does not represent an automaton state.
c    -(-b^{5, 27}_2 ∧  b^{5, 27}_1 ∧  b^{5, 27}_0 ∧ true) 
c  in CNF:
c     b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ false 
c  in DIMACS:
 8507 -8508 -8509  0
c  -3 does not represent an automaton state.
c    -( b^{5, 27}_2 ∧  b^{5, 27}_1 ∧  b^{5, 27}_0 ∧ true) 
c  in CNF:
c    -b^{5, 27}_2 ∨ -b^{5, 27}_1 ∨ -b^{5, 27}_0 ∨ false 
c  in DIMACS:
-8507 -8508 -8509  0

c i = 28
c  -2+1 --> -1
c    ( b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧  p_140) -> ( b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0)
c  in CNF:
c    -b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨  b^{5, 29}_2
c    -b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_1
c    -b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨  b^{5, 29}_0
c  in DIMACS:
-8510 -8511  8512 -140  8513 0
-8510 -8511  8512 -140 -8514 0
-8510 -8511  8512 -140  8515 0

c  -1+1 --> 0
c    ( b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0 ∧  p_140) -> (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧ -b^{5, 29}_0)
c  in CNF:
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_2
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_1
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_0
c  in DIMACS:
-8510  8511 -8512 -140 -8513 0
-8510  8511 -8512 -140 -8514 0
-8510  8511 -8512 -140 -8515 0

c  0+1 --> 1
c    (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧  p_140) -> (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0)
c  in CNF:
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_2
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_1
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨  b^{5, 29}_0
c  in DIMACS:
 8510  8511  8512 -140 -8513 0
 8510  8511  8512 -140 -8514 0
 8510  8511  8512 -140  8515 0

c  1+1 --> 2
c    (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0 ∧  p_140) -> (-b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0)
c  in CNF:
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_2
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨  b^{5, 29}_1
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ -p_140 ∨ -b^{5, 29}_0
c  in DIMACS:
 8510  8511 -8512 -140 -8513 0
 8510  8511 -8512 -140  8514 0
 8510  8511 -8512 -140 -8515 0

c  2+1 --> break 
c    (-b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧  p_140) -> break
c  in CNF:
c     b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 8510 -8511  8512 -140 1162 0


c  2-1 --> 1
c    (-b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧ -p_140) -> (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0)
c  in CNF:
c     b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_2
c     b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_1
c     b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨  b^{5, 29}_0
c  in DIMACS:
 8510 -8511  8512  140 -8513 0
 8510 -8511  8512  140 -8514 0
 8510 -8511  8512  140  8515 0

c  1-1 --> 0
c    (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0 ∧ -p_140) -> (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧ -b^{5, 29}_0)
c  in CNF:
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_2
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_1
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_0
c  in DIMACS:
 8510  8511 -8512  140 -8513 0
 8510  8511 -8512  140 -8514 0
 8510  8511 -8512  140 -8515 0

c  0-1 --> -1
c    (-b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧ -p_140) -> ( b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0)
c  in CNF:
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨  b^{5, 29}_2
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_1
c     b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨  b^{5, 29}_0
c  in DIMACS:
 8510  8511  8512  140  8513 0
 8510  8511  8512  140 -8514 0
 8510  8511  8512  140  8515 0

c  -1-1 --> -2
c    ( b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧  b^{5, 28}_0 ∧ -p_140) -> ( b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0)
c  in CNF:
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨  b^{5, 29}_2
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨  b^{5, 29}_1
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨  p_140 ∨ -b^{5, 29}_0
c  in DIMACS:
-8510  8511 -8512  140  8513 0
-8510  8511 -8512  140  8514 0
-8510  8511 -8512  140 -8515 0

c  -2-1 --> break 
c    ( b^{5, 28}_2 ∧  b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨  b^{5, 28}_0 ∨  p_140 ∨ break
c  in DIMACS:
-8510 -8511  8512  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 28}_2 ∧ -b^{5, 28}_1 ∧ -b^{5, 28}_0 ∧ true) 
c  in CNF:
c    -b^{5, 28}_2 ∨  b^{5, 28}_1 ∨  b^{5, 28}_0 ∨ false 
c  in DIMACS:
-8510  8511  8512  0

c  3 does not represent an automaton state.
c    -(-b^{5, 28}_2 ∧  b^{5, 28}_1 ∧  b^{5, 28}_0 ∧ true) 
c  in CNF:
c     b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ false 
c  in DIMACS:
 8510 -8511 -8512  0
c  -3 does not represent an automaton state.
c    -( b^{5, 28}_2 ∧  b^{5, 28}_1 ∧  b^{5, 28}_0 ∧ true) 
c  in CNF:
c    -b^{5, 28}_2 ∨ -b^{5, 28}_1 ∨ -b^{5, 28}_0 ∨ false 
c  in DIMACS:
-8510 -8511 -8512  0

c i = 29
c  -2+1 --> -1
c    ( b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧  p_145) -> ( b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0)
c  in CNF:
c    -b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨  b^{5, 30}_2
c    -b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_1
c    -b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨  b^{5, 30}_0
c  in DIMACS:
-8513 -8514  8515 -145  8516 0
-8513 -8514  8515 -145 -8517 0
-8513 -8514  8515 -145  8518 0

c  -1+1 --> 0
c    ( b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0 ∧  p_145) -> (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧ -b^{5, 30}_0)
c  in CNF:
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_2
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_1
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_0
c  in DIMACS:
-8513  8514 -8515 -145 -8516 0
-8513  8514 -8515 -145 -8517 0
-8513  8514 -8515 -145 -8518 0

c  0+1 --> 1
c    (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧  p_145) -> (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0)
c  in CNF:
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_2
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_1
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨  b^{5, 30}_0
c  in DIMACS:
 8513  8514  8515 -145 -8516 0
 8513  8514  8515 -145 -8517 0
 8513  8514  8515 -145  8518 0

c  1+1 --> 2
c    (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0 ∧  p_145) -> (-b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0)
c  in CNF:
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_2
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨  b^{5, 30}_1
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ -p_145 ∨ -b^{5, 30}_0
c  in DIMACS:
 8513  8514 -8515 -145 -8516 0
 8513  8514 -8515 -145  8517 0
 8513  8514 -8515 -145 -8518 0

c  2+1 --> break 
c    (-b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧  p_145) -> break
c  in CNF:
c     b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ -p_145 ∨ break
c  in DIMACS:
 8513 -8514  8515 -145 1162 0


c  2-1 --> 1
c    (-b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧ -p_145) -> (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0)
c  in CNF:
c     b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_2
c     b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_1
c     b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨  b^{5, 30}_0
c  in DIMACS:
 8513 -8514  8515  145 -8516 0
 8513 -8514  8515  145 -8517 0
 8513 -8514  8515  145  8518 0

c  1-1 --> 0
c    (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0 ∧ -p_145) -> (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧ -b^{5, 30}_0)
c  in CNF:
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_2
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_1
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_0
c  in DIMACS:
 8513  8514 -8515  145 -8516 0
 8513  8514 -8515  145 -8517 0
 8513  8514 -8515  145 -8518 0

c  0-1 --> -1
c    (-b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧ -p_145) -> ( b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0)
c  in CNF:
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨  b^{5, 30}_2
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_1
c     b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨  b^{5, 30}_0
c  in DIMACS:
 8513  8514  8515  145  8516 0
 8513  8514  8515  145 -8517 0
 8513  8514  8515  145  8518 0

c  -1-1 --> -2
c    ( b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧  b^{5, 29}_0 ∧ -p_145) -> ( b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0)
c  in CNF:
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨  b^{5, 30}_2
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨  b^{5, 30}_1
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨  p_145 ∨ -b^{5, 30}_0
c  in DIMACS:
-8513  8514 -8515  145  8516 0
-8513  8514 -8515  145  8517 0
-8513  8514 -8515  145 -8518 0

c  -2-1 --> break 
c    ( b^{5, 29}_2 ∧  b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧ -p_145) -> break
c  in CNF:
c    -b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨  b^{5, 29}_0 ∨  p_145 ∨ break
c  in DIMACS:
-8513 -8514  8515  145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 29}_2 ∧ -b^{5, 29}_1 ∧ -b^{5, 29}_0 ∧ true) 
c  in CNF:
c    -b^{5, 29}_2 ∨  b^{5, 29}_1 ∨  b^{5, 29}_0 ∨ false 
c  in DIMACS:
-8513  8514  8515  0

c  3 does not represent an automaton state.
c    -(-b^{5, 29}_2 ∧  b^{5, 29}_1 ∧  b^{5, 29}_0 ∧ true) 
c  in CNF:
c     b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ false 
c  in DIMACS:
 8513 -8514 -8515  0
c  -3 does not represent an automaton state.
c    -( b^{5, 29}_2 ∧  b^{5, 29}_1 ∧  b^{5, 29}_0 ∧ true) 
c  in CNF:
c    -b^{5, 29}_2 ∨ -b^{5, 29}_1 ∨ -b^{5, 29}_0 ∨ false 
c  in DIMACS:
-8513 -8514 -8515  0

c i = 30
c  -2+1 --> -1
c    ( b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧  p_150) -> ( b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0)
c  in CNF:
c    -b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨  b^{5, 31}_2
c    -b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_1
c    -b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨  b^{5, 31}_0
c  in DIMACS:
-8516 -8517  8518 -150  8519 0
-8516 -8517  8518 -150 -8520 0
-8516 -8517  8518 -150  8521 0

c  -1+1 --> 0
c    ( b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0 ∧  p_150) -> (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧ -b^{5, 31}_0)
c  in CNF:
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_2
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_1
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_0
c  in DIMACS:
-8516  8517 -8518 -150 -8519 0
-8516  8517 -8518 -150 -8520 0
-8516  8517 -8518 -150 -8521 0

c  0+1 --> 1
c    (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧  p_150) -> (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0)
c  in CNF:
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_2
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_1
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨  b^{5, 31}_0
c  in DIMACS:
 8516  8517  8518 -150 -8519 0
 8516  8517  8518 -150 -8520 0
 8516  8517  8518 -150  8521 0

c  1+1 --> 2
c    (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0 ∧  p_150) -> (-b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0)
c  in CNF:
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_2
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨  b^{5, 31}_1
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ -p_150 ∨ -b^{5, 31}_0
c  in DIMACS:
 8516  8517 -8518 -150 -8519 0
 8516  8517 -8518 -150  8520 0
 8516  8517 -8518 -150 -8521 0

c  2+1 --> break 
c    (-b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧  p_150) -> break
c  in CNF:
c     b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 8516 -8517  8518 -150 1162 0


c  2-1 --> 1
c    (-b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧ -p_150) -> (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0)
c  in CNF:
c     b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_2
c     b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_1
c     b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨  b^{5, 31}_0
c  in DIMACS:
 8516 -8517  8518  150 -8519 0
 8516 -8517  8518  150 -8520 0
 8516 -8517  8518  150  8521 0

c  1-1 --> 0
c    (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0 ∧ -p_150) -> (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧ -b^{5, 31}_0)
c  in CNF:
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_2
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_1
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_0
c  in DIMACS:
 8516  8517 -8518  150 -8519 0
 8516  8517 -8518  150 -8520 0
 8516  8517 -8518  150 -8521 0

c  0-1 --> -1
c    (-b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧ -p_150) -> ( b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0)
c  in CNF:
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨  b^{5, 31}_2
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_1
c     b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨  b^{5, 31}_0
c  in DIMACS:
 8516  8517  8518  150  8519 0
 8516  8517  8518  150 -8520 0
 8516  8517  8518  150  8521 0

c  -1-1 --> -2
c    ( b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧  b^{5, 30}_0 ∧ -p_150) -> ( b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0)
c  in CNF:
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨  b^{5, 31}_2
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨  b^{5, 31}_1
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨  p_150 ∨ -b^{5, 31}_0
c  in DIMACS:
-8516  8517 -8518  150  8519 0
-8516  8517 -8518  150  8520 0
-8516  8517 -8518  150 -8521 0

c  -2-1 --> break 
c    ( b^{5, 30}_2 ∧  b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨  b^{5, 30}_0 ∨  p_150 ∨ break
c  in DIMACS:
-8516 -8517  8518  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 30}_2 ∧ -b^{5, 30}_1 ∧ -b^{5, 30}_0 ∧ true) 
c  in CNF:
c    -b^{5, 30}_2 ∨  b^{5, 30}_1 ∨  b^{5, 30}_0 ∨ false 
c  in DIMACS:
-8516  8517  8518  0

c  3 does not represent an automaton state.
c    -(-b^{5, 30}_2 ∧  b^{5, 30}_1 ∧  b^{5, 30}_0 ∧ true) 
c  in CNF:
c     b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ false 
c  in DIMACS:
 8516 -8517 -8518  0
c  -3 does not represent an automaton state.
c    -( b^{5, 30}_2 ∧  b^{5, 30}_1 ∧  b^{5, 30}_0 ∧ true) 
c  in CNF:
c    -b^{5, 30}_2 ∨ -b^{5, 30}_1 ∨ -b^{5, 30}_0 ∨ false 
c  in DIMACS:
-8516 -8517 -8518  0

c i = 31
c  -2+1 --> -1
c    ( b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧  p_155) -> ( b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0)
c  in CNF:
c    -b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨  b^{5, 32}_2
c    -b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_1
c    -b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨  b^{5, 32}_0
c  in DIMACS:
-8519 -8520  8521 -155  8522 0
-8519 -8520  8521 -155 -8523 0
-8519 -8520  8521 -155  8524 0

c  -1+1 --> 0
c    ( b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0 ∧  p_155) -> (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧ -b^{5, 32}_0)
c  in CNF:
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_2
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_1
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_0
c  in DIMACS:
-8519  8520 -8521 -155 -8522 0
-8519  8520 -8521 -155 -8523 0
-8519  8520 -8521 -155 -8524 0

c  0+1 --> 1
c    (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧  p_155) -> (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0)
c  in CNF:
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_2
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_1
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨  b^{5, 32}_0
c  in DIMACS:
 8519  8520  8521 -155 -8522 0
 8519  8520  8521 -155 -8523 0
 8519  8520  8521 -155  8524 0

c  1+1 --> 2
c    (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0 ∧  p_155) -> (-b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0)
c  in CNF:
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_2
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨  b^{5, 32}_1
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ -p_155 ∨ -b^{5, 32}_0
c  in DIMACS:
 8519  8520 -8521 -155 -8522 0
 8519  8520 -8521 -155  8523 0
 8519  8520 -8521 -155 -8524 0

c  2+1 --> break 
c    (-b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧  p_155) -> break
c  in CNF:
c     b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ -p_155 ∨ break
c  in DIMACS:
 8519 -8520  8521 -155 1162 0


c  2-1 --> 1
c    (-b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧ -p_155) -> (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0)
c  in CNF:
c     b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_2
c     b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_1
c     b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨  b^{5, 32}_0
c  in DIMACS:
 8519 -8520  8521  155 -8522 0
 8519 -8520  8521  155 -8523 0
 8519 -8520  8521  155  8524 0

c  1-1 --> 0
c    (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0 ∧ -p_155) -> (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧ -b^{5, 32}_0)
c  in CNF:
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_2
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_1
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_0
c  in DIMACS:
 8519  8520 -8521  155 -8522 0
 8519  8520 -8521  155 -8523 0
 8519  8520 -8521  155 -8524 0

c  0-1 --> -1
c    (-b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧ -p_155) -> ( b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0)
c  in CNF:
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨  b^{5, 32}_2
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_1
c     b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨  b^{5, 32}_0
c  in DIMACS:
 8519  8520  8521  155  8522 0
 8519  8520  8521  155 -8523 0
 8519  8520  8521  155  8524 0

c  -1-1 --> -2
c    ( b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧  b^{5, 31}_0 ∧ -p_155) -> ( b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0)
c  in CNF:
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨  b^{5, 32}_2
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨  b^{5, 32}_1
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨  p_155 ∨ -b^{5, 32}_0
c  in DIMACS:
-8519  8520 -8521  155  8522 0
-8519  8520 -8521  155  8523 0
-8519  8520 -8521  155 -8524 0

c  -2-1 --> break 
c    ( b^{5, 31}_2 ∧  b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧ -p_155) -> break
c  in CNF:
c    -b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨  b^{5, 31}_0 ∨  p_155 ∨ break
c  in DIMACS:
-8519 -8520  8521  155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 31}_2 ∧ -b^{5, 31}_1 ∧ -b^{5, 31}_0 ∧ true) 
c  in CNF:
c    -b^{5, 31}_2 ∨  b^{5, 31}_1 ∨  b^{5, 31}_0 ∨ false 
c  in DIMACS:
-8519  8520  8521  0

c  3 does not represent an automaton state.
c    -(-b^{5, 31}_2 ∧  b^{5, 31}_1 ∧  b^{5, 31}_0 ∧ true) 
c  in CNF:
c     b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ false 
c  in DIMACS:
 8519 -8520 -8521  0
c  -3 does not represent an automaton state.
c    -( b^{5, 31}_2 ∧  b^{5, 31}_1 ∧  b^{5, 31}_0 ∧ true) 
c  in CNF:
c    -b^{5, 31}_2 ∨ -b^{5, 31}_1 ∨ -b^{5, 31}_0 ∨ false 
c  in DIMACS:
-8519 -8520 -8521  0

c i = 32
c  -2+1 --> -1
c    ( b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧  p_160) -> ( b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0)
c  in CNF:
c    -b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨  b^{5, 33}_2
c    -b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_1
c    -b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨  b^{5, 33}_0
c  in DIMACS:
-8522 -8523  8524 -160  8525 0
-8522 -8523  8524 -160 -8526 0
-8522 -8523  8524 -160  8527 0

c  -1+1 --> 0
c    ( b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0 ∧  p_160) -> (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧ -b^{5, 33}_0)
c  in CNF:
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_2
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_1
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_0
c  in DIMACS:
-8522  8523 -8524 -160 -8525 0
-8522  8523 -8524 -160 -8526 0
-8522  8523 -8524 -160 -8527 0

c  0+1 --> 1
c    (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧  p_160) -> (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0)
c  in CNF:
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_2
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_1
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨  b^{5, 33}_0
c  in DIMACS:
 8522  8523  8524 -160 -8525 0
 8522  8523  8524 -160 -8526 0
 8522  8523  8524 -160  8527 0

c  1+1 --> 2
c    (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0 ∧  p_160) -> (-b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0)
c  in CNF:
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_2
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨  b^{5, 33}_1
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ -p_160 ∨ -b^{5, 33}_0
c  in DIMACS:
 8522  8523 -8524 -160 -8525 0
 8522  8523 -8524 -160  8526 0
 8522  8523 -8524 -160 -8527 0

c  2+1 --> break 
c    (-b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧  p_160) -> break
c  in CNF:
c     b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 8522 -8523  8524 -160 1162 0


c  2-1 --> 1
c    (-b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧ -p_160) -> (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0)
c  in CNF:
c     b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_2
c     b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_1
c     b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨  b^{5, 33}_0
c  in DIMACS:
 8522 -8523  8524  160 -8525 0
 8522 -8523  8524  160 -8526 0
 8522 -8523  8524  160  8527 0

c  1-1 --> 0
c    (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0 ∧ -p_160) -> (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧ -b^{5, 33}_0)
c  in CNF:
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_2
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_1
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_0
c  in DIMACS:
 8522  8523 -8524  160 -8525 0
 8522  8523 -8524  160 -8526 0
 8522  8523 -8524  160 -8527 0

c  0-1 --> -1
c    (-b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧ -p_160) -> ( b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0)
c  in CNF:
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨  b^{5, 33}_2
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_1
c     b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨  b^{5, 33}_0
c  in DIMACS:
 8522  8523  8524  160  8525 0
 8522  8523  8524  160 -8526 0
 8522  8523  8524  160  8527 0

c  -1-1 --> -2
c    ( b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧  b^{5, 32}_0 ∧ -p_160) -> ( b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0)
c  in CNF:
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨  b^{5, 33}_2
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨  b^{5, 33}_1
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨  p_160 ∨ -b^{5, 33}_0
c  in DIMACS:
-8522  8523 -8524  160  8525 0
-8522  8523 -8524  160  8526 0
-8522  8523 -8524  160 -8527 0

c  -2-1 --> break 
c    ( b^{5, 32}_2 ∧  b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨  b^{5, 32}_0 ∨  p_160 ∨ break
c  in DIMACS:
-8522 -8523  8524  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 32}_2 ∧ -b^{5, 32}_1 ∧ -b^{5, 32}_0 ∧ true) 
c  in CNF:
c    -b^{5, 32}_2 ∨  b^{5, 32}_1 ∨  b^{5, 32}_0 ∨ false 
c  in DIMACS:
-8522  8523  8524  0

c  3 does not represent an automaton state.
c    -(-b^{5, 32}_2 ∧  b^{5, 32}_1 ∧  b^{5, 32}_0 ∧ true) 
c  in CNF:
c     b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ false 
c  in DIMACS:
 8522 -8523 -8524  0
c  -3 does not represent an automaton state.
c    -( b^{5, 32}_2 ∧  b^{5, 32}_1 ∧  b^{5, 32}_0 ∧ true) 
c  in CNF:
c    -b^{5, 32}_2 ∨ -b^{5, 32}_1 ∨ -b^{5, 32}_0 ∨ false 
c  in DIMACS:
-8522 -8523 -8524  0

c i = 33
c  -2+1 --> -1
c    ( b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧  p_165) -> ( b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0)
c  in CNF:
c    -b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨  b^{5, 34}_2
c    -b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_1
c    -b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨  b^{5, 34}_0
c  in DIMACS:
-8525 -8526  8527 -165  8528 0
-8525 -8526  8527 -165 -8529 0
-8525 -8526  8527 -165  8530 0

c  -1+1 --> 0
c    ( b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0 ∧  p_165) -> (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧ -b^{5, 34}_0)
c  in CNF:
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_2
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_1
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_0
c  in DIMACS:
-8525  8526 -8527 -165 -8528 0
-8525  8526 -8527 -165 -8529 0
-8525  8526 -8527 -165 -8530 0

c  0+1 --> 1
c    (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧  p_165) -> (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0)
c  in CNF:
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_2
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_1
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨  b^{5, 34}_0
c  in DIMACS:
 8525  8526  8527 -165 -8528 0
 8525  8526  8527 -165 -8529 0
 8525  8526  8527 -165  8530 0

c  1+1 --> 2
c    (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0 ∧  p_165) -> (-b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0)
c  in CNF:
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_2
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨  b^{5, 34}_1
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ -p_165 ∨ -b^{5, 34}_0
c  in DIMACS:
 8525  8526 -8527 -165 -8528 0
 8525  8526 -8527 -165  8529 0
 8525  8526 -8527 -165 -8530 0

c  2+1 --> break 
c    (-b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧  p_165) -> break
c  in CNF:
c     b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 8525 -8526  8527 -165 1162 0


c  2-1 --> 1
c    (-b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧ -p_165) -> (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0)
c  in CNF:
c     b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_2
c     b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_1
c     b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨  b^{5, 34}_0
c  in DIMACS:
 8525 -8526  8527  165 -8528 0
 8525 -8526  8527  165 -8529 0
 8525 -8526  8527  165  8530 0

c  1-1 --> 0
c    (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0 ∧ -p_165) -> (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧ -b^{5, 34}_0)
c  in CNF:
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_2
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_1
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_0
c  in DIMACS:
 8525  8526 -8527  165 -8528 0
 8525  8526 -8527  165 -8529 0
 8525  8526 -8527  165 -8530 0

c  0-1 --> -1
c    (-b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧ -p_165) -> ( b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0)
c  in CNF:
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨  b^{5, 34}_2
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_1
c     b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨  b^{5, 34}_0
c  in DIMACS:
 8525  8526  8527  165  8528 0
 8525  8526  8527  165 -8529 0
 8525  8526  8527  165  8530 0

c  -1-1 --> -2
c    ( b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧  b^{5, 33}_0 ∧ -p_165) -> ( b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0)
c  in CNF:
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨  b^{5, 34}_2
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨  b^{5, 34}_1
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨  p_165 ∨ -b^{5, 34}_0
c  in DIMACS:
-8525  8526 -8527  165  8528 0
-8525  8526 -8527  165  8529 0
-8525  8526 -8527  165 -8530 0

c  -2-1 --> break 
c    ( b^{5, 33}_2 ∧  b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨  b^{5, 33}_0 ∨  p_165 ∨ break
c  in DIMACS:
-8525 -8526  8527  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 33}_2 ∧ -b^{5, 33}_1 ∧ -b^{5, 33}_0 ∧ true) 
c  in CNF:
c    -b^{5, 33}_2 ∨  b^{5, 33}_1 ∨  b^{5, 33}_0 ∨ false 
c  in DIMACS:
-8525  8526  8527  0

c  3 does not represent an automaton state.
c    -(-b^{5, 33}_2 ∧  b^{5, 33}_1 ∧  b^{5, 33}_0 ∧ true) 
c  in CNF:
c     b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ false 
c  in DIMACS:
 8525 -8526 -8527  0
c  -3 does not represent an automaton state.
c    -( b^{5, 33}_2 ∧  b^{5, 33}_1 ∧  b^{5, 33}_0 ∧ true) 
c  in CNF:
c    -b^{5, 33}_2 ∨ -b^{5, 33}_1 ∨ -b^{5, 33}_0 ∨ false 
c  in DIMACS:
-8525 -8526 -8527  0

c i = 34
c  -2+1 --> -1
c    ( b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧  p_170) -> ( b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0)
c  in CNF:
c    -b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨  b^{5, 35}_2
c    -b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_1
c    -b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨  b^{5, 35}_0
c  in DIMACS:
-8528 -8529  8530 -170  8531 0
-8528 -8529  8530 -170 -8532 0
-8528 -8529  8530 -170  8533 0

c  -1+1 --> 0
c    ( b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0 ∧  p_170) -> (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧ -b^{5, 35}_0)
c  in CNF:
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_2
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_1
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_0
c  in DIMACS:
-8528  8529 -8530 -170 -8531 0
-8528  8529 -8530 -170 -8532 0
-8528  8529 -8530 -170 -8533 0

c  0+1 --> 1
c    (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧  p_170) -> (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0)
c  in CNF:
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_2
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_1
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨  b^{5, 35}_0
c  in DIMACS:
 8528  8529  8530 -170 -8531 0
 8528  8529  8530 -170 -8532 0
 8528  8529  8530 -170  8533 0

c  1+1 --> 2
c    (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0 ∧  p_170) -> (-b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0)
c  in CNF:
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_2
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨  b^{5, 35}_1
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ -p_170 ∨ -b^{5, 35}_0
c  in DIMACS:
 8528  8529 -8530 -170 -8531 0
 8528  8529 -8530 -170  8532 0
 8528  8529 -8530 -170 -8533 0

c  2+1 --> break 
c    (-b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧  p_170) -> break
c  in CNF:
c     b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 8528 -8529  8530 -170 1162 0


c  2-1 --> 1
c    (-b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧ -p_170) -> (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0)
c  in CNF:
c     b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_2
c     b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_1
c     b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨  b^{5, 35}_0
c  in DIMACS:
 8528 -8529  8530  170 -8531 0
 8528 -8529  8530  170 -8532 0
 8528 -8529  8530  170  8533 0

c  1-1 --> 0
c    (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0 ∧ -p_170) -> (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧ -b^{5, 35}_0)
c  in CNF:
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_2
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_1
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_0
c  in DIMACS:
 8528  8529 -8530  170 -8531 0
 8528  8529 -8530  170 -8532 0
 8528  8529 -8530  170 -8533 0

c  0-1 --> -1
c    (-b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧ -p_170) -> ( b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0)
c  in CNF:
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨  b^{5, 35}_2
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_1
c     b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨  b^{5, 35}_0
c  in DIMACS:
 8528  8529  8530  170  8531 0
 8528  8529  8530  170 -8532 0
 8528  8529  8530  170  8533 0

c  -1-1 --> -2
c    ( b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧  b^{5, 34}_0 ∧ -p_170) -> ( b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0)
c  in CNF:
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨  b^{5, 35}_2
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨  b^{5, 35}_1
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨  p_170 ∨ -b^{5, 35}_0
c  in DIMACS:
-8528  8529 -8530  170  8531 0
-8528  8529 -8530  170  8532 0
-8528  8529 -8530  170 -8533 0

c  -2-1 --> break 
c    ( b^{5, 34}_2 ∧  b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨  b^{5, 34}_0 ∨  p_170 ∨ break
c  in DIMACS:
-8528 -8529  8530  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 34}_2 ∧ -b^{5, 34}_1 ∧ -b^{5, 34}_0 ∧ true) 
c  in CNF:
c    -b^{5, 34}_2 ∨  b^{5, 34}_1 ∨  b^{5, 34}_0 ∨ false 
c  in DIMACS:
-8528  8529  8530  0

c  3 does not represent an automaton state.
c    -(-b^{5, 34}_2 ∧  b^{5, 34}_1 ∧  b^{5, 34}_0 ∧ true) 
c  in CNF:
c     b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ false 
c  in DIMACS:
 8528 -8529 -8530  0
c  -3 does not represent an automaton state.
c    -( b^{5, 34}_2 ∧  b^{5, 34}_1 ∧  b^{5, 34}_0 ∧ true) 
c  in CNF:
c    -b^{5, 34}_2 ∨ -b^{5, 34}_1 ∨ -b^{5, 34}_0 ∨ false 
c  in DIMACS:
-8528 -8529 -8530  0

c i = 35
c  -2+1 --> -1
c    ( b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧  p_175) -> ( b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0)
c  in CNF:
c    -b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨  b^{5, 36}_2
c    -b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_1
c    -b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨  b^{5, 36}_0
c  in DIMACS:
-8531 -8532  8533 -175  8534 0
-8531 -8532  8533 -175 -8535 0
-8531 -8532  8533 -175  8536 0

c  -1+1 --> 0
c    ( b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0 ∧  p_175) -> (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧ -b^{5, 36}_0)
c  in CNF:
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_2
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_1
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_0
c  in DIMACS:
-8531  8532 -8533 -175 -8534 0
-8531  8532 -8533 -175 -8535 0
-8531  8532 -8533 -175 -8536 0

c  0+1 --> 1
c    (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧  p_175) -> (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0)
c  in CNF:
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_2
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_1
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨  b^{5, 36}_0
c  in DIMACS:
 8531  8532  8533 -175 -8534 0
 8531  8532  8533 -175 -8535 0
 8531  8532  8533 -175  8536 0

c  1+1 --> 2
c    (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0 ∧  p_175) -> (-b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0)
c  in CNF:
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_2
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨  b^{5, 36}_1
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ -p_175 ∨ -b^{5, 36}_0
c  in DIMACS:
 8531  8532 -8533 -175 -8534 0
 8531  8532 -8533 -175  8535 0
 8531  8532 -8533 -175 -8536 0

c  2+1 --> break 
c    (-b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧  p_175) -> break
c  in CNF:
c     b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 8531 -8532  8533 -175 1162 0


c  2-1 --> 1
c    (-b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧ -p_175) -> (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0)
c  in CNF:
c     b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_2
c     b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_1
c     b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨  b^{5, 36}_0
c  in DIMACS:
 8531 -8532  8533  175 -8534 0
 8531 -8532  8533  175 -8535 0
 8531 -8532  8533  175  8536 0

c  1-1 --> 0
c    (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0 ∧ -p_175) -> (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧ -b^{5, 36}_0)
c  in CNF:
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_2
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_1
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_0
c  in DIMACS:
 8531  8532 -8533  175 -8534 0
 8531  8532 -8533  175 -8535 0
 8531  8532 -8533  175 -8536 0

c  0-1 --> -1
c    (-b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧ -p_175) -> ( b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0)
c  in CNF:
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨  b^{5, 36}_2
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_1
c     b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨  b^{5, 36}_0
c  in DIMACS:
 8531  8532  8533  175  8534 0
 8531  8532  8533  175 -8535 0
 8531  8532  8533  175  8536 0

c  -1-1 --> -2
c    ( b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧  b^{5, 35}_0 ∧ -p_175) -> ( b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0)
c  in CNF:
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨  b^{5, 36}_2
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨  b^{5, 36}_1
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨  p_175 ∨ -b^{5, 36}_0
c  in DIMACS:
-8531  8532 -8533  175  8534 0
-8531  8532 -8533  175  8535 0
-8531  8532 -8533  175 -8536 0

c  -2-1 --> break 
c    ( b^{5, 35}_2 ∧  b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨  b^{5, 35}_0 ∨  p_175 ∨ break
c  in DIMACS:
-8531 -8532  8533  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 35}_2 ∧ -b^{5, 35}_1 ∧ -b^{5, 35}_0 ∧ true) 
c  in CNF:
c    -b^{5, 35}_2 ∨  b^{5, 35}_1 ∨  b^{5, 35}_0 ∨ false 
c  in DIMACS:
-8531  8532  8533  0

c  3 does not represent an automaton state.
c    -(-b^{5, 35}_2 ∧  b^{5, 35}_1 ∧  b^{5, 35}_0 ∧ true) 
c  in CNF:
c     b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ false 
c  in DIMACS:
 8531 -8532 -8533  0
c  -3 does not represent an automaton state.
c    -( b^{5, 35}_2 ∧  b^{5, 35}_1 ∧  b^{5, 35}_0 ∧ true) 
c  in CNF:
c    -b^{5, 35}_2 ∨ -b^{5, 35}_1 ∨ -b^{5, 35}_0 ∨ false 
c  in DIMACS:
-8531 -8532 -8533  0

c i = 36
c  -2+1 --> -1
c    ( b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧  p_180) -> ( b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0)
c  in CNF:
c    -b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨  b^{5, 37}_2
c    -b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_1
c    -b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨  b^{5, 37}_0
c  in DIMACS:
-8534 -8535  8536 -180  8537 0
-8534 -8535  8536 -180 -8538 0
-8534 -8535  8536 -180  8539 0

c  -1+1 --> 0
c    ( b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0 ∧  p_180) -> (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧ -b^{5, 37}_0)
c  in CNF:
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_2
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_1
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_0
c  in DIMACS:
-8534  8535 -8536 -180 -8537 0
-8534  8535 -8536 -180 -8538 0
-8534  8535 -8536 -180 -8539 0

c  0+1 --> 1
c    (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧  p_180) -> (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0)
c  in CNF:
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_2
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_1
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨  b^{5, 37}_0
c  in DIMACS:
 8534  8535  8536 -180 -8537 0
 8534  8535  8536 -180 -8538 0
 8534  8535  8536 -180  8539 0

c  1+1 --> 2
c    (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0 ∧  p_180) -> (-b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0)
c  in CNF:
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_2
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨  b^{5, 37}_1
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ -p_180 ∨ -b^{5, 37}_0
c  in DIMACS:
 8534  8535 -8536 -180 -8537 0
 8534  8535 -8536 -180  8538 0
 8534  8535 -8536 -180 -8539 0

c  2+1 --> break 
c    (-b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧  p_180) -> break
c  in CNF:
c     b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 8534 -8535  8536 -180 1162 0


c  2-1 --> 1
c    (-b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧ -p_180) -> (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0)
c  in CNF:
c     b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_2
c     b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_1
c     b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨  b^{5, 37}_0
c  in DIMACS:
 8534 -8535  8536  180 -8537 0
 8534 -8535  8536  180 -8538 0
 8534 -8535  8536  180  8539 0

c  1-1 --> 0
c    (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0 ∧ -p_180) -> (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧ -b^{5, 37}_0)
c  in CNF:
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_2
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_1
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_0
c  in DIMACS:
 8534  8535 -8536  180 -8537 0
 8534  8535 -8536  180 -8538 0
 8534  8535 -8536  180 -8539 0

c  0-1 --> -1
c    (-b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧ -p_180) -> ( b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0)
c  in CNF:
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨  b^{5, 37}_2
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_1
c     b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨  b^{5, 37}_0
c  in DIMACS:
 8534  8535  8536  180  8537 0
 8534  8535  8536  180 -8538 0
 8534  8535  8536  180  8539 0

c  -1-1 --> -2
c    ( b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧  b^{5, 36}_0 ∧ -p_180) -> ( b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0)
c  in CNF:
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨  b^{5, 37}_2
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨  b^{5, 37}_1
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨  p_180 ∨ -b^{5, 37}_0
c  in DIMACS:
-8534  8535 -8536  180  8537 0
-8534  8535 -8536  180  8538 0
-8534  8535 -8536  180 -8539 0

c  -2-1 --> break 
c    ( b^{5, 36}_2 ∧  b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨  b^{5, 36}_0 ∨  p_180 ∨ break
c  in DIMACS:
-8534 -8535  8536  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 36}_2 ∧ -b^{5, 36}_1 ∧ -b^{5, 36}_0 ∧ true) 
c  in CNF:
c    -b^{5, 36}_2 ∨  b^{5, 36}_1 ∨  b^{5, 36}_0 ∨ false 
c  in DIMACS:
-8534  8535  8536  0

c  3 does not represent an automaton state.
c    -(-b^{5, 36}_2 ∧  b^{5, 36}_1 ∧  b^{5, 36}_0 ∧ true) 
c  in CNF:
c     b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ false 
c  in DIMACS:
 8534 -8535 -8536  0
c  -3 does not represent an automaton state.
c    -( b^{5, 36}_2 ∧  b^{5, 36}_1 ∧  b^{5, 36}_0 ∧ true) 
c  in CNF:
c    -b^{5, 36}_2 ∨ -b^{5, 36}_1 ∨ -b^{5, 36}_0 ∨ false 
c  in DIMACS:
-8534 -8535 -8536  0

c i = 37
c  -2+1 --> -1
c    ( b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧  p_185) -> ( b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0)
c  in CNF:
c    -b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨  b^{5, 38}_2
c    -b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_1
c    -b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨  b^{5, 38}_0
c  in DIMACS:
-8537 -8538  8539 -185  8540 0
-8537 -8538  8539 -185 -8541 0
-8537 -8538  8539 -185  8542 0

c  -1+1 --> 0
c    ( b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0 ∧  p_185) -> (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧ -b^{5, 38}_0)
c  in CNF:
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_2
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_1
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_0
c  in DIMACS:
-8537  8538 -8539 -185 -8540 0
-8537  8538 -8539 -185 -8541 0
-8537  8538 -8539 -185 -8542 0

c  0+1 --> 1
c    (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧  p_185) -> (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0)
c  in CNF:
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_2
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_1
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨  b^{5, 38}_0
c  in DIMACS:
 8537  8538  8539 -185 -8540 0
 8537  8538  8539 -185 -8541 0
 8537  8538  8539 -185  8542 0

c  1+1 --> 2
c    (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0 ∧  p_185) -> (-b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0)
c  in CNF:
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_2
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨  b^{5, 38}_1
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ -p_185 ∨ -b^{5, 38}_0
c  in DIMACS:
 8537  8538 -8539 -185 -8540 0
 8537  8538 -8539 -185  8541 0
 8537  8538 -8539 -185 -8542 0

c  2+1 --> break 
c    (-b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧  p_185) -> break
c  in CNF:
c     b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ -p_185 ∨ break
c  in DIMACS:
 8537 -8538  8539 -185 1162 0


c  2-1 --> 1
c    (-b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧ -p_185) -> (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0)
c  in CNF:
c     b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_2
c     b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_1
c     b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨  b^{5, 38}_0
c  in DIMACS:
 8537 -8538  8539  185 -8540 0
 8537 -8538  8539  185 -8541 0
 8537 -8538  8539  185  8542 0

c  1-1 --> 0
c    (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0 ∧ -p_185) -> (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧ -b^{5, 38}_0)
c  in CNF:
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_2
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_1
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_0
c  in DIMACS:
 8537  8538 -8539  185 -8540 0
 8537  8538 -8539  185 -8541 0
 8537  8538 -8539  185 -8542 0

c  0-1 --> -1
c    (-b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧ -p_185) -> ( b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0)
c  in CNF:
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨  b^{5, 38}_2
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_1
c     b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨  b^{5, 38}_0
c  in DIMACS:
 8537  8538  8539  185  8540 0
 8537  8538  8539  185 -8541 0
 8537  8538  8539  185  8542 0

c  -1-1 --> -2
c    ( b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧  b^{5, 37}_0 ∧ -p_185) -> ( b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0)
c  in CNF:
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨  b^{5, 38}_2
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨  b^{5, 38}_1
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨  p_185 ∨ -b^{5, 38}_0
c  in DIMACS:
-8537  8538 -8539  185  8540 0
-8537  8538 -8539  185  8541 0
-8537  8538 -8539  185 -8542 0

c  -2-1 --> break 
c    ( b^{5, 37}_2 ∧  b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧ -p_185) -> break
c  in CNF:
c    -b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨  b^{5, 37}_0 ∨  p_185 ∨ break
c  in DIMACS:
-8537 -8538  8539  185 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 37}_2 ∧ -b^{5, 37}_1 ∧ -b^{5, 37}_0 ∧ true) 
c  in CNF:
c    -b^{5, 37}_2 ∨  b^{5, 37}_1 ∨  b^{5, 37}_0 ∨ false 
c  in DIMACS:
-8537  8538  8539  0

c  3 does not represent an automaton state.
c    -(-b^{5, 37}_2 ∧  b^{5, 37}_1 ∧  b^{5, 37}_0 ∧ true) 
c  in CNF:
c     b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ false 
c  in DIMACS:
 8537 -8538 -8539  0
c  -3 does not represent an automaton state.
c    -( b^{5, 37}_2 ∧  b^{5, 37}_1 ∧  b^{5, 37}_0 ∧ true) 
c  in CNF:
c    -b^{5, 37}_2 ∨ -b^{5, 37}_1 ∨ -b^{5, 37}_0 ∨ false 
c  in DIMACS:
-8537 -8538 -8539  0

c i = 38
c  -2+1 --> -1
c    ( b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧  p_190) -> ( b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0)
c  in CNF:
c    -b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨  b^{5, 39}_2
c    -b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_1
c    -b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨  b^{5, 39}_0
c  in DIMACS:
-8540 -8541  8542 -190  8543 0
-8540 -8541  8542 -190 -8544 0
-8540 -8541  8542 -190  8545 0

c  -1+1 --> 0
c    ( b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0 ∧  p_190) -> (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧ -b^{5, 39}_0)
c  in CNF:
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_2
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_1
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_0
c  in DIMACS:
-8540  8541 -8542 -190 -8543 0
-8540  8541 -8542 -190 -8544 0
-8540  8541 -8542 -190 -8545 0

c  0+1 --> 1
c    (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧  p_190) -> (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0)
c  in CNF:
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_2
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_1
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨  b^{5, 39}_0
c  in DIMACS:
 8540  8541  8542 -190 -8543 0
 8540  8541  8542 -190 -8544 0
 8540  8541  8542 -190  8545 0

c  1+1 --> 2
c    (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0 ∧  p_190) -> (-b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0)
c  in CNF:
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_2
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨  b^{5, 39}_1
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ -p_190 ∨ -b^{5, 39}_0
c  in DIMACS:
 8540  8541 -8542 -190 -8543 0
 8540  8541 -8542 -190  8544 0
 8540  8541 -8542 -190 -8545 0

c  2+1 --> break 
c    (-b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧  p_190) -> break
c  in CNF:
c     b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 8540 -8541  8542 -190 1162 0


c  2-1 --> 1
c    (-b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧ -p_190) -> (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0)
c  in CNF:
c     b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_2
c     b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_1
c     b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨  b^{5, 39}_0
c  in DIMACS:
 8540 -8541  8542  190 -8543 0
 8540 -8541  8542  190 -8544 0
 8540 -8541  8542  190  8545 0

c  1-1 --> 0
c    (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0 ∧ -p_190) -> (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧ -b^{5, 39}_0)
c  in CNF:
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_2
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_1
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_0
c  in DIMACS:
 8540  8541 -8542  190 -8543 0
 8540  8541 -8542  190 -8544 0
 8540  8541 -8542  190 -8545 0

c  0-1 --> -1
c    (-b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧ -p_190) -> ( b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0)
c  in CNF:
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨  b^{5, 39}_2
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_1
c     b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨  b^{5, 39}_0
c  in DIMACS:
 8540  8541  8542  190  8543 0
 8540  8541  8542  190 -8544 0
 8540  8541  8542  190  8545 0

c  -1-1 --> -2
c    ( b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧  b^{5, 38}_0 ∧ -p_190) -> ( b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0)
c  in CNF:
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨  b^{5, 39}_2
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨  b^{5, 39}_1
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨  p_190 ∨ -b^{5, 39}_0
c  in DIMACS:
-8540  8541 -8542  190  8543 0
-8540  8541 -8542  190  8544 0
-8540  8541 -8542  190 -8545 0

c  -2-1 --> break 
c    ( b^{5, 38}_2 ∧  b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨  b^{5, 38}_0 ∨  p_190 ∨ break
c  in DIMACS:
-8540 -8541  8542  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 38}_2 ∧ -b^{5, 38}_1 ∧ -b^{5, 38}_0 ∧ true) 
c  in CNF:
c    -b^{5, 38}_2 ∨  b^{5, 38}_1 ∨  b^{5, 38}_0 ∨ false 
c  in DIMACS:
-8540  8541  8542  0

c  3 does not represent an automaton state.
c    -(-b^{5, 38}_2 ∧  b^{5, 38}_1 ∧  b^{5, 38}_0 ∧ true) 
c  in CNF:
c     b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ false 
c  in DIMACS:
 8540 -8541 -8542  0
c  -3 does not represent an automaton state.
c    -( b^{5, 38}_2 ∧  b^{5, 38}_1 ∧  b^{5, 38}_0 ∧ true) 
c  in CNF:
c    -b^{5, 38}_2 ∨ -b^{5, 38}_1 ∨ -b^{5, 38}_0 ∨ false 
c  in DIMACS:
-8540 -8541 -8542  0

c i = 39
c  -2+1 --> -1
c    ( b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧  p_195) -> ( b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0)
c  in CNF:
c    -b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨  b^{5, 40}_2
c    -b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_1
c    -b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨  b^{5, 40}_0
c  in DIMACS:
-8543 -8544  8545 -195  8546 0
-8543 -8544  8545 -195 -8547 0
-8543 -8544  8545 -195  8548 0

c  -1+1 --> 0
c    ( b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0 ∧  p_195) -> (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧ -b^{5, 40}_0)
c  in CNF:
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_2
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_1
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_0
c  in DIMACS:
-8543  8544 -8545 -195 -8546 0
-8543  8544 -8545 -195 -8547 0
-8543  8544 -8545 -195 -8548 0

c  0+1 --> 1
c    (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧  p_195) -> (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0)
c  in CNF:
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_2
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_1
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨  b^{5, 40}_0
c  in DIMACS:
 8543  8544  8545 -195 -8546 0
 8543  8544  8545 -195 -8547 0
 8543  8544  8545 -195  8548 0

c  1+1 --> 2
c    (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0 ∧  p_195) -> (-b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0)
c  in CNF:
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_2
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨  b^{5, 40}_1
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ -p_195 ∨ -b^{5, 40}_0
c  in DIMACS:
 8543  8544 -8545 -195 -8546 0
 8543  8544 -8545 -195  8547 0
 8543  8544 -8545 -195 -8548 0

c  2+1 --> break 
c    (-b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧  p_195) -> break
c  in CNF:
c     b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 8543 -8544  8545 -195 1162 0


c  2-1 --> 1
c    (-b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧ -p_195) -> (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0)
c  in CNF:
c     b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_2
c     b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_1
c     b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨  b^{5, 40}_0
c  in DIMACS:
 8543 -8544  8545  195 -8546 0
 8543 -8544  8545  195 -8547 0
 8543 -8544  8545  195  8548 0

c  1-1 --> 0
c    (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0 ∧ -p_195) -> (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧ -b^{5, 40}_0)
c  in CNF:
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_2
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_1
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_0
c  in DIMACS:
 8543  8544 -8545  195 -8546 0
 8543  8544 -8545  195 -8547 0
 8543  8544 -8545  195 -8548 0

c  0-1 --> -1
c    (-b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧ -p_195) -> ( b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0)
c  in CNF:
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨  b^{5, 40}_2
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_1
c     b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨  b^{5, 40}_0
c  in DIMACS:
 8543  8544  8545  195  8546 0
 8543  8544  8545  195 -8547 0
 8543  8544  8545  195  8548 0

c  -1-1 --> -2
c    ( b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧  b^{5, 39}_0 ∧ -p_195) -> ( b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0)
c  in CNF:
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨  b^{5, 40}_2
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨  b^{5, 40}_1
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨  p_195 ∨ -b^{5, 40}_0
c  in DIMACS:
-8543  8544 -8545  195  8546 0
-8543  8544 -8545  195  8547 0
-8543  8544 -8545  195 -8548 0

c  -2-1 --> break 
c    ( b^{5, 39}_2 ∧  b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨  b^{5, 39}_0 ∨  p_195 ∨ break
c  in DIMACS:
-8543 -8544  8545  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 39}_2 ∧ -b^{5, 39}_1 ∧ -b^{5, 39}_0 ∧ true) 
c  in CNF:
c    -b^{5, 39}_2 ∨  b^{5, 39}_1 ∨  b^{5, 39}_0 ∨ false 
c  in DIMACS:
-8543  8544  8545  0

c  3 does not represent an automaton state.
c    -(-b^{5, 39}_2 ∧  b^{5, 39}_1 ∧  b^{5, 39}_0 ∧ true) 
c  in CNF:
c     b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ false 
c  in DIMACS:
 8543 -8544 -8545  0
c  -3 does not represent an automaton state.
c    -( b^{5, 39}_2 ∧  b^{5, 39}_1 ∧  b^{5, 39}_0 ∧ true) 
c  in CNF:
c    -b^{5, 39}_2 ∨ -b^{5, 39}_1 ∨ -b^{5, 39}_0 ∨ false 
c  in DIMACS:
-8543 -8544 -8545  0

c i = 40
c  -2+1 --> -1
c    ( b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧  p_200) -> ( b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0)
c  in CNF:
c    -b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨  b^{5, 41}_2
c    -b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_1
c    -b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨  b^{5, 41}_0
c  in DIMACS:
-8546 -8547  8548 -200  8549 0
-8546 -8547  8548 -200 -8550 0
-8546 -8547  8548 -200  8551 0

c  -1+1 --> 0
c    ( b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0 ∧  p_200) -> (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧ -b^{5, 41}_0)
c  in CNF:
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_2
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_1
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_0
c  in DIMACS:
-8546  8547 -8548 -200 -8549 0
-8546  8547 -8548 -200 -8550 0
-8546  8547 -8548 -200 -8551 0

c  0+1 --> 1
c    (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧  p_200) -> (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0)
c  in CNF:
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_2
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_1
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨  b^{5, 41}_0
c  in DIMACS:
 8546  8547  8548 -200 -8549 0
 8546  8547  8548 -200 -8550 0
 8546  8547  8548 -200  8551 0

c  1+1 --> 2
c    (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0 ∧  p_200) -> (-b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0)
c  in CNF:
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_2
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨  b^{5, 41}_1
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ -p_200 ∨ -b^{5, 41}_0
c  in DIMACS:
 8546  8547 -8548 -200 -8549 0
 8546  8547 -8548 -200  8550 0
 8546  8547 -8548 -200 -8551 0

c  2+1 --> break 
c    (-b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧  p_200) -> break
c  in CNF:
c     b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 8546 -8547  8548 -200 1162 0


c  2-1 --> 1
c    (-b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧ -p_200) -> (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0)
c  in CNF:
c     b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_2
c     b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_1
c     b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨  b^{5, 41}_0
c  in DIMACS:
 8546 -8547  8548  200 -8549 0
 8546 -8547  8548  200 -8550 0
 8546 -8547  8548  200  8551 0

c  1-1 --> 0
c    (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0 ∧ -p_200) -> (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧ -b^{5, 41}_0)
c  in CNF:
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_2
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_1
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_0
c  in DIMACS:
 8546  8547 -8548  200 -8549 0
 8546  8547 -8548  200 -8550 0
 8546  8547 -8548  200 -8551 0

c  0-1 --> -1
c    (-b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧ -p_200) -> ( b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0)
c  in CNF:
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨  b^{5, 41}_2
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_1
c     b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨  b^{5, 41}_0
c  in DIMACS:
 8546  8547  8548  200  8549 0
 8546  8547  8548  200 -8550 0
 8546  8547  8548  200  8551 0

c  -1-1 --> -2
c    ( b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧  b^{5, 40}_0 ∧ -p_200) -> ( b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0)
c  in CNF:
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨  b^{5, 41}_2
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨  b^{5, 41}_1
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨  p_200 ∨ -b^{5, 41}_0
c  in DIMACS:
-8546  8547 -8548  200  8549 0
-8546  8547 -8548  200  8550 0
-8546  8547 -8548  200 -8551 0

c  -2-1 --> break 
c    ( b^{5, 40}_2 ∧  b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨  b^{5, 40}_0 ∨  p_200 ∨ break
c  in DIMACS:
-8546 -8547  8548  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 40}_2 ∧ -b^{5, 40}_1 ∧ -b^{5, 40}_0 ∧ true) 
c  in CNF:
c    -b^{5, 40}_2 ∨  b^{5, 40}_1 ∨  b^{5, 40}_0 ∨ false 
c  in DIMACS:
-8546  8547  8548  0

c  3 does not represent an automaton state.
c    -(-b^{5, 40}_2 ∧  b^{5, 40}_1 ∧  b^{5, 40}_0 ∧ true) 
c  in CNF:
c     b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ false 
c  in DIMACS:
 8546 -8547 -8548  0
c  -3 does not represent an automaton state.
c    -( b^{5, 40}_2 ∧  b^{5, 40}_1 ∧  b^{5, 40}_0 ∧ true) 
c  in CNF:
c    -b^{5, 40}_2 ∨ -b^{5, 40}_1 ∨ -b^{5, 40}_0 ∨ false 
c  in DIMACS:
-8546 -8547 -8548  0

c i = 41
c  -2+1 --> -1
c    ( b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧  p_205) -> ( b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0)
c  in CNF:
c    -b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨  b^{5, 42}_2
c    -b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_1
c    -b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨  b^{5, 42}_0
c  in DIMACS:
-8549 -8550  8551 -205  8552 0
-8549 -8550  8551 -205 -8553 0
-8549 -8550  8551 -205  8554 0

c  -1+1 --> 0
c    ( b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0 ∧  p_205) -> (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧ -b^{5, 42}_0)
c  in CNF:
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_2
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_1
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_0
c  in DIMACS:
-8549  8550 -8551 -205 -8552 0
-8549  8550 -8551 -205 -8553 0
-8549  8550 -8551 -205 -8554 0

c  0+1 --> 1
c    (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧  p_205) -> (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0)
c  in CNF:
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_2
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_1
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨  b^{5, 42}_0
c  in DIMACS:
 8549  8550  8551 -205 -8552 0
 8549  8550  8551 -205 -8553 0
 8549  8550  8551 -205  8554 0

c  1+1 --> 2
c    (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0 ∧  p_205) -> (-b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0)
c  in CNF:
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_2
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨  b^{5, 42}_1
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ -p_205 ∨ -b^{5, 42}_0
c  in DIMACS:
 8549  8550 -8551 -205 -8552 0
 8549  8550 -8551 -205  8553 0
 8549  8550 -8551 -205 -8554 0

c  2+1 --> break 
c    (-b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧  p_205) -> break
c  in CNF:
c     b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ -p_205 ∨ break
c  in DIMACS:
 8549 -8550  8551 -205 1162 0


c  2-1 --> 1
c    (-b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧ -p_205) -> (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0)
c  in CNF:
c     b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_2
c     b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_1
c     b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨  b^{5, 42}_0
c  in DIMACS:
 8549 -8550  8551  205 -8552 0
 8549 -8550  8551  205 -8553 0
 8549 -8550  8551  205  8554 0

c  1-1 --> 0
c    (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0 ∧ -p_205) -> (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧ -b^{5, 42}_0)
c  in CNF:
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_2
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_1
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_0
c  in DIMACS:
 8549  8550 -8551  205 -8552 0
 8549  8550 -8551  205 -8553 0
 8549  8550 -8551  205 -8554 0

c  0-1 --> -1
c    (-b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧ -p_205) -> ( b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0)
c  in CNF:
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨  b^{5, 42}_2
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_1
c     b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨  b^{5, 42}_0
c  in DIMACS:
 8549  8550  8551  205  8552 0
 8549  8550  8551  205 -8553 0
 8549  8550  8551  205  8554 0

c  -1-1 --> -2
c    ( b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧  b^{5, 41}_0 ∧ -p_205) -> ( b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0)
c  in CNF:
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨  b^{5, 42}_2
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨  b^{5, 42}_1
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨  p_205 ∨ -b^{5, 42}_0
c  in DIMACS:
-8549  8550 -8551  205  8552 0
-8549  8550 -8551  205  8553 0
-8549  8550 -8551  205 -8554 0

c  -2-1 --> break 
c    ( b^{5, 41}_2 ∧  b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧ -p_205) -> break
c  in CNF:
c    -b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨  b^{5, 41}_0 ∨  p_205 ∨ break
c  in DIMACS:
-8549 -8550  8551  205 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 41}_2 ∧ -b^{5, 41}_1 ∧ -b^{5, 41}_0 ∧ true) 
c  in CNF:
c    -b^{5, 41}_2 ∨  b^{5, 41}_1 ∨  b^{5, 41}_0 ∨ false 
c  in DIMACS:
-8549  8550  8551  0

c  3 does not represent an automaton state.
c    -(-b^{5, 41}_2 ∧  b^{5, 41}_1 ∧  b^{5, 41}_0 ∧ true) 
c  in CNF:
c     b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ false 
c  in DIMACS:
 8549 -8550 -8551  0
c  -3 does not represent an automaton state.
c    -( b^{5, 41}_2 ∧  b^{5, 41}_1 ∧  b^{5, 41}_0 ∧ true) 
c  in CNF:
c    -b^{5, 41}_2 ∨ -b^{5, 41}_1 ∨ -b^{5, 41}_0 ∨ false 
c  in DIMACS:
-8549 -8550 -8551  0

c i = 42
c  -2+1 --> -1
c    ( b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧  p_210) -> ( b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0)
c  in CNF:
c    -b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨  b^{5, 43}_2
c    -b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_1
c    -b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨  b^{5, 43}_0
c  in DIMACS:
-8552 -8553  8554 -210  8555 0
-8552 -8553  8554 -210 -8556 0
-8552 -8553  8554 -210  8557 0

c  -1+1 --> 0
c    ( b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0 ∧  p_210) -> (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧ -b^{5, 43}_0)
c  in CNF:
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_2
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_1
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_0
c  in DIMACS:
-8552  8553 -8554 -210 -8555 0
-8552  8553 -8554 -210 -8556 0
-8552  8553 -8554 -210 -8557 0

c  0+1 --> 1
c    (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧  p_210) -> (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0)
c  in CNF:
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_2
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_1
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨  b^{5, 43}_0
c  in DIMACS:
 8552  8553  8554 -210 -8555 0
 8552  8553  8554 -210 -8556 0
 8552  8553  8554 -210  8557 0

c  1+1 --> 2
c    (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0 ∧  p_210) -> (-b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0)
c  in CNF:
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_2
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨  b^{5, 43}_1
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ -p_210 ∨ -b^{5, 43}_0
c  in DIMACS:
 8552  8553 -8554 -210 -8555 0
 8552  8553 -8554 -210  8556 0
 8552  8553 -8554 -210 -8557 0

c  2+1 --> break 
c    (-b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧  p_210) -> break
c  in CNF:
c     b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 8552 -8553  8554 -210 1162 0


c  2-1 --> 1
c    (-b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧ -p_210) -> (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0)
c  in CNF:
c     b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_2
c     b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_1
c     b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨  b^{5, 43}_0
c  in DIMACS:
 8552 -8553  8554  210 -8555 0
 8552 -8553  8554  210 -8556 0
 8552 -8553  8554  210  8557 0

c  1-1 --> 0
c    (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0 ∧ -p_210) -> (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧ -b^{5, 43}_0)
c  in CNF:
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_2
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_1
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_0
c  in DIMACS:
 8552  8553 -8554  210 -8555 0
 8552  8553 -8554  210 -8556 0
 8552  8553 -8554  210 -8557 0

c  0-1 --> -1
c    (-b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧ -p_210) -> ( b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0)
c  in CNF:
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨  b^{5, 43}_2
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_1
c     b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨  b^{5, 43}_0
c  in DIMACS:
 8552  8553  8554  210  8555 0
 8552  8553  8554  210 -8556 0
 8552  8553  8554  210  8557 0

c  -1-1 --> -2
c    ( b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧  b^{5, 42}_0 ∧ -p_210) -> ( b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0)
c  in CNF:
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨  b^{5, 43}_2
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨  b^{5, 43}_1
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨  p_210 ∨ -b^{5, 43}_0
c  in DIMACS:
-8552  8553 -8554  210  8555 0
-8552  8553 -8554  210  8556 0
-8552  8553 -8554  210 -8557 0

c  -2-1 --> break 
c    ( b^{5, 42}_2 ∧  b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨  b^{5, 42}_0 ∨  p_210 ∨ break
c  in DIMACS:
-8552 -8553  8554  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 42}_2 ∧ -b^{5, 42}_1 ∧ -b^{5, 42}_0 ∧ true) 
c  in CNF:
c    -b^{5, 42}_2 ∨  b^{5, 42}_1 ∨  b^{5, 42}_0 ∨ false 
c  in DIMACS:
-8552  8553  8554  0

c  3 does not represent an automaton state.
c    -(-b^{5, 42}_2 ∧  b^{5, 42}_1 ∧  b^{5, 42}_0 ∧ true) 
c  in CNF:
c     b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ false 
c  in DIMACS:
 8552 -8553 -8554  0
c  -3 does not represent an automaton state.
c    -( b^{5, 42}_2 ∧  b^{5, 42}_1 ∧  b^{5, 42}_0 ∧ true) 
c  in CNF:
c    -b^{5, 42}_2 ∨ -b^{5, 42}_1 ∨ -b^{5, 42}_0 ∨ false 
c  in DIMACS:
-8552 -8553 -8554  0

c i = 43
c  -2+1 --> -1
c    ( b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧  p_215) -> ( b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0)
c  in CNF:
c    -b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨  b^{5, 44}_2
c    -b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_1
c    -b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨  b^{5, 44}_0
c  in DIMACS:
-8555 -8556  8557 -215  8558 0
-8555 -8556  8557 -215 -8559 0
-8555 -8556  8557 -215  8560 0

c  -1+1 --> 0
c    ( b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0 ∧  p_215) -> (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧ -b^{5, 44}_0)
c  in CNF:
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_2
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_1
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_0
c  in DIMACS:
-8555  8556 -8557 -215 -8558 0
-8555  8556 -8557 -215 -8559 0
-8555  8556 -8557 -215 -8560 0

c  0+1 --> 1
c    (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧  p_215) -> (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0)
c  in CNF:
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_2
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_1
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨  b^{5, 44}_0
c  in DIMACS:
 8555  8556  8557 -215 -8558 0
 8555  8556  8557 -215 -8559 0
 8555  8556  8557 -215  8560 0

c  1+1 --> 2
c    (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0 ∧  p_215) -> (-b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0)
c  in CNF:
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_2
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨  b^{5, 44}_1
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ -p_215 ∨ -b^{5, 44}_0
c  in DIMACS:
 8555  8556 -8557 -215 -8558 0
 8555  8556 -8557 -215  8559 0
 8555  8556 -8557 -215 -8560 0

c  2+1 --> break 
c    (-b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧  p_215) -> break
c  in CNF:
c     b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ -p_215 ∨ break
c  in DIMACS:
 8555 -8556  8557 -215 1162 0


c  2-1 --> 1
c    (-b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧ -p_215) -> (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0)
c  in CNF:
c     b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_2
c     b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_1
c     b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨  b^{5, 44}_0
c  in DIMACS:
 8555 -8556  8557  215 -8558 0
 8555 -8556  8557  215 -8559 0
 8555 -8556  8557  215  8560 0

c  1-1 --> 0
c    (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0 ∧ -p_215) -> (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧ -b^{5, 44}_0)
c  in CNF:
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_2
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_1
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_0
c  in DIMACS:
 8555  8556 -8557  215 -8558 0
 8555  8556 -8557  215 -8559 0
 8555  8556 -8557  215 -8560 0

c  0-1 --> -1
c    (-b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧ -p_215) -> ( b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0)
c  in CNF:
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨  b^{5, 44}_2
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_1
c     b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨  b^{5, 44}_0
c  in DIMACS:
 8555  8556  8557  215  8558 0
 8555  8556  8557  215 -8559 0
 8555  8556  8557  215  8560 0

c  -1-1 --> -2
c    ( b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧  b^{5, 43}_0 ∧ -p_215) -> ( b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0)
c  in CNF:
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨  b^{5, 44}_2
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨  b^{5, 44}_1
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨  p_215 ∨ -b^{5, 44}_0
c  in DIMACS:
-8555  8556 -8557  215  8558 0
-8555  8556 -8557  215  8559 0
-8555  8556 -8557  215 -8560 0

c  -2-1 --> break 
c    ( b^{5, 43}_2 ∧  b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧ -p_215) -> break
c  in CNF:
c    -b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨  b^{5, 43}_0 ∨  p_215 ∨ break
c  in DIMACS:
-8555 -8556  8557  215 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 43}_2 ∧ -b^{5, 43}_1 ∧ -b^{5, 43}_0 ∧ true) 
c  in CNF:
c    -b^{5, 43}_2 ∨  b^{5, 43}_1 ∨  b^{5, 43}_0 ∨ false 
c  in DIMACS:
-8555  8556  8557  0

c  3 does not represent an automaton state.
c    -(-b^{5, 43}_2 ∧  b^{5, 43}_1 ∧  b^{5, 43}_0 ∧ true) 
c  in CNF:
c     b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ false 
c  in DIMACS:
 8555 -8556 -8557  0
c  -3 does not represent an automaton state.
c    -( b^{5, 43}_2 ∧  b^{5, 43}_1 ∧  b^{5, 43}_0 ∧ true) 
c  in CNF:
c    -b^{5, 43}_2 ∨ -b^{5, 43}_1 ∨ -b^{5, 43}_0 ∨ false 
c  in DIMACS:
-8555 -8556 -8557  0

c i = 44
c  -2+1 --> -1
c    ( b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧  p_220) -> ( b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0)
c  in CNF:
c    -b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨  b^{5, 45}_2
c    -b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_1
c    -b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨  b^{5, 45}_0
c  in DIMACS:
-8558 -8559  8560 -220  8561 0
-8558 -8559  8560 -220 -8562 0
-8558 -8559  8560 -220  8563 0

c  -1+1 --> 0
c    ( b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0 ∧  p_220) -> (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧ -b^{5, 45}_0)
c  in CNF:
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_2
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_1
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_0
c  in DIMACS:
-8558  8559 -8560 -220 -8561 0
-8558  8559 -8560 -220 -8562 0
-8558  8559 -8560 -220 -8563 0

c  0+1 --> 1
c    (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧  p_220) -> (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0)
c  in CNF:
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_2
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_1
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨  b^{5, 45}_0
c  in DIMACS:
 8558  8559  8560 -220 -8561 0
 8558  8559  8560 -220 -8562 0
 8558  8559  8560 -220  8563 0

c  1+1 --> 2
c    (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0 ∧  p_220) -> (-b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0)
c  in CNF:
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_2
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨  b^{5, 45}_1
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ -p_220 ∨ -b^{5, 45}_0
c  in DIMACS:
 8558  8559 -8560 -220 -8561 0
 8558  8559 -8560 -220  8562 0
 8558  8559 -8560 -220 -8563 0

c  2+1 --> break 
c    (-b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧  p_220) -> break
c  in CNF:
c     b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 8558 -8559  8560 -220 1162 0


c  2-1 --> 1
c    (-b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧ -p_220) -> (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0)
c  in CNF:
c     b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_2
c     b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_1
c     b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨  b^{5, 45}_0
c  in DIMACS:
 8558 -8559  8560  220 -8561 0
 8558 -8559  8560  220 -8562 0
 8558 -8559  8560  220  8563 0

c  1-1 --> 0
c    (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0 ∧ -p_220) -> (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧ -b^{5, 45}_0)
c  in CNF:
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_2
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_1
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_0
c  in DIMACS:
 8558  8559 -8560  220 -8561 0
 8558  8559 -8560  220 -8562 0
 8558  8559 -8560  220 -8563 0

c  0-1 --> -1
c    (-b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧ -p_220) -> ( b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0)
c  in CNF:
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨  b^{5, 45}_2
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_1
c     b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨  b^{5, 45}_0
c  in DIMACS:
 8558  8559  8560  220  8561 0
 8558  8559  8560  220 -8562 0
 8558  8559  8560  220  8563 0

c  -1-1 --> -2
c    ( b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧  b^{5, 44}_0 ∧ -p_220) -> ( b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0)
c  in CNF:
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨  b^{5, 45}_2
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨  b^{5, 45}_1
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨  p_220 ∨ -b^{5, 45}_0
c  in DIMACS:
-8558  8559 -8560  220  8561 0
-8558  8559 -8560  220  8562 0
-8558  8559 -8560  220 -8563 0

c  -2-1 --> break 
c    ( b^{5, 44}_2 ∧  b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨  b^{5, 44}_0 ∨  p_220 ∨ break
c  in DIMACS:
-8558 -8559  8560  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 44}_2 ∧ -b^{5, 44}_1 ∧ -b^{5, 44}_0 ∧ true) 
c  in CNF:
c    -b^{5, 44}_2 ∨  b^{5, 44}_1 ∨  b^{5, 44}_0 ∨ false 
c  in DIMACS:
-8558  8559  8560  0

c  3 does not represent an automaton state.
c    -(-b^{5, 44}_2 ∧  b^{5, 44}_1 ∧  b^{5, 44}_0 ∧ true) 
c  in CNF:
c     b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ false 
c  in DIMACS:
 8558 -8559 -8560  0
c  -3 does not represent an automaton state.
c    -( b^{5, 44}_2 ∧  b^{5, 44}_1 ∧  b^{5, 44}_0 ∧ true) 
c  in CNF:
c    -b^{5, 44}_2 ∨ -b^{5, 44}_1 ∨ -b^{5, 44}_0 ∨ false 
c  in DIMACS:
-8558 -8559 -8560  0

c i = 45
c  -2+1 --> -1
c    ( b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧  p_225) -> ( b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0)
c  in CNF:
c    -b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨  b^{5, 46}_2
c    -b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_1
c    -b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨  b^{5, 46}_0
c  in DIMACS:
-8561 -8562  8563 -225  8564 0
-8561 -8562  8563 -225 -8565 0
-8561 -8562  8563 -225  8566 0

c  -1+1 --> 0
c    ( b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0 ∧  p_225) -> (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧ -b^{5, 46}_0)
c  in CNF:
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_2
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_1
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_0
c  in DIMACS:
-8561  8562 -8563 -225 -8564 0
-8561  8562 -8563 -225 -8565 0
-8561  8562 -8563 -225 -8566 0

c  0+1 --> 1
c    (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧  p_225) -> (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0)
c  in CNF:
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_2
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_1
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨  b^{5, 46}_0
c  in DIMACS:
 8561  8562  8563 -225 -8564 0
 8561  8562  8563 -225 -8565 0
 8561  8562  8563 -225  8566 0

c  1+1 --> 2
c    (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0 ∧  p_225) -> (-b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0)
c  in CNF:
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_2
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨  b^{5, 46}_1
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ -p_225 ∨ -b^{5, 46}_0
c  in DIMACS:
 8561  8562 -8563 -225 -8564 0
 8561  8562 -8563 -225  8565 0
 8561  8562 -8563 -225 -8566 0

c  2+1 --> break 
c    (-b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧  p_225) -> break
c  in CNF:
c     b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 8561 -8562  8563 -225 1162 0


c  2-1 --> 1
c    (-b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧ -p_225) -> (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0)
c  in CNF:
c     b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_2
c     b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_1
c     b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨  b^{5, 46}_0
c  in DIMACS:
 8561 -8562  8563  225 -8564 0
 8561 -8562  8563  225 -8565 0
 8561 -8562  8563  225  8566 0

c  1-1 --> 0
c    (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0 ∧ -p_225) -> (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧ -b^{5, 46}_0)
c  in CNF:
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_2
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_1
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_0
c  in DIMACS:
 8561  8562 -8563  225 -8564 0
 8561  8562 -8563  225 -8565 0
 8561  8562 -8563  225 -8566 0

c  0-1 --> -1
c    (-b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧ -p_225) -> ( b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0)
c  in CNF:
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨  b^{5, 46}_2
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_1
c     b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨  b^{5, 46}_0
c  in DIMACS:
 8561  8562  8563  225  8564 0
 8561  8562  8563  225 -8565 0
 8561  8562  8563  225  8566 0

c  -1-1 --> -2
c    ( b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧  b^{5, 45}_0 ∧ -p_225) -> ( b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0)
c  in CNF:
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨  b^{5, 46}_2
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨  b^{5, 46}_1
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨  p_225 ∨ -b^{5, 46}_0
c  in DIMACS:
-8561  8562 -8563  225  8564 0
-8561  8562 -8563  225  8565 0
-8561  8562 -8563  225 -8566 0

c  -2-1 --> break 
c    ( b^{5, 45}_2 ∧  b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨  b^{5, 45}_0 ∨  p_225 ∨ break
c  in DIMACS:
-8561 -8562  8563  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 45}_2 ∧ -b^{5, 45}_1 ∧ -b^{5, 45}_0 ∧ true) 
c  in CNF:
c    -b^{5, 45}_2 ∨  b^{5, 45}_1 ∨  b^{5, 45}_0 ∨ false 
c  in DIMACS:
-8561  8562  8563  0

c  3 does not represent an automaton state.
c    -(-b^{5, 45}_2 ∧  b^{5, 45}_1 ∧  b^{5, 45}_0 ∧ true) 
c  in CNF:
c     b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ false 
c  in DIMACS:
 8561 -8562 -8563  0
c  -3 does not represent an automaton state.
c    -( b^{5, 45}_2 ∧  b^{5, 45}_1 ∧  b^{5, 45}_0 ∧ true) 
c  in CNF:
c    -b^{5, 45}_2 ∨ -b^{5, 45}_1 ∨ -b^{5, 45}_0 ∨ false 
c  in DIMACS:
-8561 -8562 -8563  0

c i = 46
c  -2+1 --> -1
c    ( b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧  p_230) -> ( b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0)
c  in CNF:
c    -b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨  b^{5, 47}_2
c    -b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_1
c    -b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨  b^{5, 47}_0
c  in DIMACS:
-8564 -8565  8566 -230  8567 0
-8564 -8565  8566 -230 -8568 0
-8564 -8565  8566 -230  8569 0

c  -1+1 --> 0
c    ( b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0 ∧  p_230) -> (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧ -b^{5, 47}_0)
c  in CNF:
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_2
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_1
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_0
c  in DIMACS:
-8564  8565 -8566 -230 -8567 0
-8564  8565 -8566 -230 -8568 0
-8564  8565 -8566 -230 -8569 0

c  0+1 --> 1
c    (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧  p_230) -> (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0)
c  in CNF:
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_2
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_1
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨  b^{5, 47}_0
c  in DIMACS:
 8564  8565  8566 -230 -8567 0
 8564  8565  8566 -230 -8568 0
 8564  8565  8566 -230  8569 0

c  1+1 --> 2
c    (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0 ∧  p_230) -> (-b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0)
c  in CNF:
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_2
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨  b^{5, 47}_1
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ -p_230 ∨ -b^{5, 47}_0
c  in DIMACS:
 8564  8565 -8566 -230 -8567 0
 8564  8565 -8566 -230  8568 0
 8564  8565 -8566 -230 -8569 0

c  2+1 --> break 
c    (-b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧  p_230) -> break
c  in CNF:
c     b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 8564 -8565  8566 -230 1162 0


c  2-1 --> 1
c    (-b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧ -p_230) -> (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0)
c  in CNF:
c     b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_2
c     b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_1
c     b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨  b^{5, 47}_0
c  in DIMACS:
 8564 -8565  8566  230 -8567 0
 8564 -8565  8566  230 -8568 0
 8564 -8565  8566  230  8569 0

c  1-1 --> 0
c    (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0 ∧ -p_230) -> (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧ -b^{5, 47}_0)
c  in CNF:
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_2
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_1
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_0
c  in DIMACS:
 8564  8565 -8566  230 -8567 0
 8564  8565 -8566  230 -8568 0
 8564  8565 -8566  230 -8569 0

c  0-1 --> -1
c    (-b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧ -p_230) -> ( b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0)
c  in CNF:
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨  b^{5, 47}_2
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_1
c     b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨  b^{5, 47}_0
c  in DIMACS:
 8564  8565  8566  230  8567 0
 8564  8565  8566  230 -8568 0
 8564  8565  8566  230  8569 0

c  -1-1 --> -2
c    ( b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧  b^{5, 46}_0 ∧ -p_230) -> ( b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0)
c  in CNF:
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨  b^{5, 47}_2
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨  b^{5, 47}_1
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨  p_230 ∨ -b^{5, 47}_0
c  in DIMACS:
-8564  8565 -8566  230  8567 0
-8564  8565 -8566  230  8568 0
-8564  8565 -8566  230 -8569 0

c  -2-1 --> break 
c    ( b^{5, 46}_2 ∧  b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨  b^{5, 46}_0 ∨  p_230 ∨ break
c  in DIMACS:
-8564 -8565  8566  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 46}_2 ∧ -b^{5, 46}_1 ∧ -b^{5, 46}_0 ∧ true) 
c  in CNF:
c    -b^{5, 46}_2 ∨  b^{5, 46}_1 ∨  b^{5, 46}_0 ∨ false 
c  in DIMACS:
-8564  8565  8566  0

c  3 does not represent an automaton state.
c    -(-b^{5, 46}_2 ∧  b^{5, 46}_1 ∧  b^{5, 46}_0 ∧ true) 
c  in CNF:
c     b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ false 
c  in DIMACS:
 8564 -8565 -8566  0
c  -3 does not represent an automaton state.
c    -( b^{5, 46}_2 ∧  b^{5, 46}_1 ∧  b^{5, 46}_0 ∧ true) 
c  in CNF:
c    -b^{5, 46}_2 ∨ -b^{5, 46}_1 ∨ -b^{5, 46}_0 ∨ false 
c  in DIMACS:
-8564 -8565 -8566  0

c i = 47
c  -2+1 --> -1
c    ( b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧  p_235) -> ( b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0)
c  in CNF:
c    -b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨  b^{5, 48}_2
c    -b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_1
c    -b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨  b^{5, 48}_0
c  in DIMACS:
-8567 -8568  8569 -235  8570 0
-8567 -8568  8569 -235 -8571 0
-8567 -8568  8569 -235  8572 0

c  -1+1 --> 0
c    ( b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0 ∧  p_235) -> (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧ -b^{5, 48}_0)
c  in CNF:
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_2
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_1
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_0
c  in DIMACS:
-8567  8568 -8569 -235 -8570 0
-8567  8568 -8569 -235 -8571 0
-8567  8568 -8569 -235 -8572 0

c  0+1 --> 1
c    (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧  p_235) -> (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0)
c  in CNF:
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_2
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_1
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨  b^{5, 48}_0
c  in DIMACS:
 8567  8568  8569 -235 -8570 0
 8567  8568  8569 -235 -8571 0
 8567  8568  8569 -235  8572 0

c  1+1 --> 2
c    (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0 ∧  p_235) -> (-b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0)
c  in CNF:
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_2
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨  b^{5, 48}_1
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ -p_235 ∨ -b^{5, 48}_0
c  in DIMACS:
 8567  8568 -8569 -235 -8570 0
 8567  8568 -8569 -235  8571 0
 8567  8568 -8569 -235 -8572 0

c  2+1 --> break 
c    (-b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧  p_235) -> break
c  in CNF:
c     b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ -p_235 ∨ break
c  in DIMACS:
 8567 -8568  8569 -235 1162 0


c  2-1 --> 1
c    (-b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧ -p_235) -> (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0)
c  in CNF:
c     b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_2
c     b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_1
c     b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨  b^{5, 48}_0
c  in DIMACS:
 8567 -8568  8569  235 -8570 0
 8567 -8568  8569  235 -8571 0
 8567 -8568  8569  235  8572 0

c  1-1 --> 0
c    (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0 ∧ -p_235) -> (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧ -b^{5, 48}_0)
c  in CNF:
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_2
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_1
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_0
c  in DIMACS:
 8567  8568 -8569  235 -8570 0
 8567  8568 -8569  235 -8571 0
 8567  8568 -8569  235 -8572 0

c  0-1 --> -1
c    (-b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧ -p_235) -> ( b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0)
c  in CNF:
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨  b^{5, 48}_2
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_1
c     b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨  b^{5, 48}_0
c  in DIMACS:
 8567  8568  8569  235  8570 0
 8567  8568  8569  235 -8571 0
 8567  8568  8569  235  8572 0

c  -1-1 --> -2
c    ( b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧  b^{5, 47}_0 ∧ -p_235) -> ( b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0)
c  in CNF:
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨  b^{5, 48}_2
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨  b^{5, 48}_1
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨  p_235 ∨ -b^{5, 48}_0
c  in DIMACS:
-8567  8568 -8569  235  8570 0
-8567  8568 -8569  235  8571 0
-8567  8568 -8569  235 -8572 0

c  -2-1 --> break 
c    ( b^{5, 47}_2 ∧  b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧ -p_235) -> break
c  in CNF:
c    -b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨  b^{5, 47}_0 ∨  p_235 ∨ break
c  in DIMACS:
-8567 -8568  8569  235 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 47}_2 ∧ -b^{5, 47}_1 ∧ -b^{5, 47}_0 ∧ true) 
c  in CNF:
c    -b^{5, 47}_2 ∨  b^{5, 47}_1 ∨  b^{5, 47}_0 ∨ false 
c  in DIMACS:
-8567  8568  8569  0

c  3 does not represent an automaton state.
c    -(-b^{5, 47}_2 ∧  b^{5, 47}_1 ∧  b^{5, 47}_0 ∧ true) 
c  in CNF:
c     b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ false 
c  in DIMACS:
 8567 -8568 -8569  0
c  -3 does not represent an automaton state.
c    -( b^{5, 47}_2 ∧  b^{5, 47}_1 ∧  b^{5, 47}_0 ∧ true) 
c  in CNF:
c    -b^{5, 47}_2 ∨ -b^{5, 47}_1 ∨ -b^{5, 47}_0 ∨ false 
c  in DIMACS:
-8567 -8568 -8569  0

c i = 48
c  -2+1 --> -1
c    ( b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧  p_240) -> ( b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0)
c  in CNF:
c    -b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨  b^{5, 49}_2
c    -b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_1
c    -b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨  b^{5, 49}_0
c  in DIMACS:
-8570 -8571  8572 -240  8573 0
-8570 -8571  8572 -240 -8574 0
-8570 -8571  8572 -240  8575 0

c  -1+1 --> 0
c    ( b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0 ∧  p_240) -> (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧ -b^{5, 49}_0)
c  in CNF:
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_2
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_1
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_0
c  in DIMACS:
-8570  8571 -8572 -240 -8573 0
-8570  8571 -8572 -240 -8574 0
-8570  8571 -8572 -240 -8575 0

c  0+1 --> 1
c    (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧  p_240) -> (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0)
c  in CNF:
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_2
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_1
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨  b^{5, 49}_0
c  in DIMACS:
 8570  8571  8572 -240 -8573 0
 8570  8571  8572 -240 -8574 0
 8570  8571  8572 -240  8575 0

c  1+1 --> 2
c    (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0 ∧  p_240) -> (-b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0)
c  in CNF:
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_2
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨  b^{5, 49}_1
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ -p_240 ∨ -b^{5, 49}_0
c  in DIMACS:
 8570  8571 -8572 -240 -8573 0
 8570  8571 -8572 -240  8574 0
 8570  8571 -8572 -240 -8575 0

c  2+1 --> break 
c    (-b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧  p_240) -> break
c  in CNF:
c     b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 8570 -8571  8572 -240 1162 0


c  2-1 --> 1
c    (-b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧ -p_240) -> (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0)
c  in CNF:
c     b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_2
c     b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_1
c     b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨  b^{5, 49}_0
c  in DIMACS:
 8570 -8571  8572  240 -8573 0
 8570 -8571  8572  240 -8574 0
 8570 -8571  8572  240  8575 0

c  1-1 --> 0
c    (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0 ∧ -p_240) -> (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧ -b^{5, 49}_0)
c  in CNF:
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_2
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_1
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_0
c  in DIMACS:
 8570  8571 -8572  240 -8573 0
 8570  8571 -8572  240 -8574 0
 8570  8571 -8572  240 -8575 0

c  0-1 --> -1
c    (-b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧ -p_240) -> ( b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0)
c  in CNF:
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨  b^{5, 49}_2
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_1
c     b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨  b^{5, 49}_0
c  in DIMACS:
 8570  8571  8572  240  8573 0
 8570  8571  8572  240 -8574 0
 8570  8571  8572  240  8575 0

c  -1-1 --> -2
c    ( b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧  b^{5, 48}_0 ∧ -p_240) -> ( b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0)
c  in CNF:
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨  b^{5, 49}_2
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨  b^{5, 49}_1
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨  p_240 ∨ -b^{5, 49}_0
c  in DIMACS:
-8570  8571 -8572  240  8573 0
-8570  8571 -8572  240  8574 0
-8570  8571 -8572  240 -8575 0

c  -2-1 --> break 
c    ( b^{5, 48}_2 ∧  b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨  b^{5, 48}_0 ∨  p_240 ∨ break
c  in DIMACS:
-8570 -8571  8572  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 48}_2 ∧ -b^{5, 48}_1 ∧ -b^{5, 48}_0 ∧ true) 
c  in CNF:
c    -b^{5, 48}_2 ∨  b^{5, 48}_1 ∨  b^{5, 48}_0 ∨ false 
c  in DIMACS:
-8570  8571  8572  0

c  3 does not represent an automaton state.
c    -(-b^{5, 48}_2 ∧  b^{5, 48}_1 ∧  b^{5, 48}_0 ∧ true) 
c  in CNF:
c     b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ false 
c  in DIMACS:
 8570 -8571 -8572  0
c  -3 does not represent an automaton state.
c    -( b^{5, 48}_2 ∧  b^{5, 48}_1 ∧  b^{5, 48}_0 ∧ true) 
c  in CNF:
c    -b^{5, 48}_2 ∨ -b^{5, 48}_1 ∨ -b^{5, 48}_0 ∨ false 
c  in DIMACS:
-8570 -8571 -8572  0

c i = 49
c  -2+1 --> -1
c    ( b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧  p_245) -> ( b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0)
c  in CNF:
c    -b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨  b^{5, 50}_2
c    -b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_1
c    -b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨  b^{5, 50}_0
c  in DIMACS:
-8573 -8574  8575 -245  8576 0
-8573 -8574  8575 -245 -8577 0
-8573 -8574  8575 -245  8578 0

c  -1+1 --> 0
c    ( b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0 ∧  p_245) -> (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧ -b^{5, 50}_0)
c  in CNF:
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_2
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_1
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_0
c  in DIMACS:
-8573  8574 -8575 -245 -8576 0
-8573  8574 -8575 -245 -8577 0
-8573  8574 -8575 -245 -8578 0

c  0+1 --> 1
c    (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧  p_245) -> (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0)
c  in CNF:
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_2
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_1
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨  b^{5, 50}_0
c  in DIMACS:
 8573  8574  8575 -245 -8576 0
 8573  8574  8575 -245 -8577 0
 8573  8574  8575 -245  8578 0

c  1+1 --> 2
c    (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0 ∧  p_245) -> (-b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0)
c  in CNF:
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_2
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨  b^{5, 50}_1
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ -p_245 ∨ -b^{5, 50}_0
c  in DIMACS:
 8573  8574 -8575 -245 -8576 0
 8573  8574 -8575 -245  8577 0
 8573  8574 -8575 -245 -8578 0

c  2+1 --> break 
c    (-b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧  p_245) -> break
c  in CNF:
c     b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 8573 -8574  8575 -245 1162 0


c  2-1 --> 1
c    (-b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧ -p_245) -> (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0)
c  in CNF:
c     b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_2
c     b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_1
c     b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨  b^{5, 50}_0
c  in DIMACS:
 8573 -8574  8575  245 -8576 0
 8573 -8574  8575  245 -8577 0
 8573 -8574  8575  245  8578 0

c  1-1 --> 0
c    (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0 ∧ -p_245) -> (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧ -b^{5, 50}_0)
c  in CNF:
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_2
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_1
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_0
c  in DIMACS:
 8573  8574 -8575  245 -8576 0
 8573  8574 -8575  245 -8577 0
 8573  8574 -8575  245 -8578 0

c  0-1 --> -1
c    (-b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧ -p_245) -> ( b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0)
c  in CNF:
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨  b^{5, 50}_2
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_1
c     b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨  b^{5, 50}_0
c  in DIMACS:
 8573  8574  8575  245  8576 0
 8573  8574  8575  245 -8577 0
 8573  8574  8575  245  8578 0

c  -1-1 --> -2
c    ( b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧  b^{5, 49}_0 ∧ -p_245) -> ( b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0)
c  in CNF:
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨  b^{5, 50}_2
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨  b^{5, 50}_1
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨  p_245 ∨ -b^{5, 50}_0
c  in DIMACS:
-8573  8574 -8575  245  8576 0
-8573  8574 -8575  245  8577 0
-8573  8574 -8575  245 -8578 0

c  -2-1 --> break 
c    ( b^{5, 49}_2 ∧  b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨  b^{5, 49}_0 ∨  p_245 ∨ break
c  in DIMACS:
-8573 -8574  8575  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 49}_2 ∧ -b^{5, 49}_1 ∧ -b^{5, 49}_0 ∧ true) 
c  in CNF:
c    -b^{5, 49}_2 ∨  b^{5, 49}_1 ∨  b^{5, 49}_0 ∨ false 
c  in DIMACS:
-8573  8574  8575  0

c  3 does not represent an automaton state.
c    -(-b^{5, 49}_2 ∧  b^{5, 49}_1 ∧  b^{5, 49}_0 ∧ true) 
c  in CNF:
c     b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ false 
c  in DIMACS:
 8573 -8574 -8575  0
c  -3 does not represent an automaton state.
c    -( b^{5, 49}_2 ∧  b^{5, 49}_1 ∧  b^{5, 49}_0 ∧ true) 
c  in CNF:
c    -b^{5, 49}_2 ∨ -b^{5, 49}_1 ∨ -b^{5, 49}_0 ∨ false 
c  in DIMACS:
-8573 -8574 -8575  0

c i = 50
c  -2+1 --> -1
c    ( b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧  p_250) -> ( b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0)
c  in CNF:
c    -b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨  b^{5, 51}_2
c    -b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_1
c    -b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨  b^{5, 51}_0
c  in DIMACS:
-8576 -8577  8578 -250  8579 0
-8576 -8577  8578 -250 -8580 0
-8576 -8577  8578 -250  8581 0

c  -1+1 --> 0
c    ( b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0 ∧  p_250) -> (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧ -b^{5, 51}_0)
c  in CNF:
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_2
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_1
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_0
c  in DIMACS:
-8576  8577 -8578 -250 -8579 0
-8576  8577 -8578 -250 -8580 0
-8576  8577 -8578 -250 -8581 0

c  0+1 --> 1
c    (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧  p_250) -> (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0)
c  in CNF:
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_2
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_1
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨  b^{5, 51}_0
c  in DIMACS:
 8576  8577  8578 -250 -8579 0
 8576  8577  8578 -250 -8580 0
 8576  8577  8578 -250  8581 0

c  1+1 --> 2
c    (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0 ∧  p_250) -> (-b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0)
c  in CNF:
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_2
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨  b^{5, 51}_1
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ -p_250 ∨ -b^{5, 51}_0
c  in DIMACS:
 8576  8577 -8578 -250 -8579 0
 8576  8577 -8578 -250  8580 0
 8576  8577 -8578 -250 -8581 0

c  2+1 --> break 
c    (-b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧  p_250) -> break
c  in CNF:
c     b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 8576 -8577  8578 -250 1162 0


c  2-1 --> 1
c    (-b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧ -p_250) -> (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0)
c  in CNF:
c     b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_2
c     b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_1
c     b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨  b^{5, 51}_0
c  in DIMACS:
 8576 -8577  8578  250 -8579 0
 8576 -8577  8578  250 -8580 0
 8576 -8577  8578  250  8581 0

c  1-1 --> 0
c    (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0 ∧ -p_250) -> (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧ -b^{5, 51}_0)
c  in CNF:
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_2
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_1
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_0
c  in DIMACS:
 8576  8577 -8578  250 -8579 0
 8576  8577 -8578  250 -8580 0
 8576  8577 -8578  250 -8581 0

c  0-1 --> -1
c    (-b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧ -p_250) -> ( b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0)
c  in CNF:
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨  b^{5, 51}_2
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_1
c     b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨  b^{5, 51}_0
c  in DIMACS:
 8576  8577  8578  250  8579 0
 8576  8577  8578  250 -8580 0
 8576  8577  8578  250  8581 0

c  -1-1 --> -2
c    ( b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧  b^{5, 50}_0 ∧ -p_250) -> ( b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0)
c  in CNF:
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨  b^{5, 51}_2
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨  b^{5, 51}_1
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨  p_250 ∨ -b^{5, 51}_0
c  in DIMACS:
-8576  8577 -8578  250  8579 0
-8576  8577 -8578  250  8580 0
-8576  8577 -8578  250 -8581 0

c  -2-1 --> break 
c    ( b^{5, 50}_2 ∧  b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨  b^{5, 50}_0 ∨  p_250 ∨ break
c  in DIMACS:
-8576 -8577  8578  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 50}_2 ∧ -b^{5, 50}_1 ∧ -b^{5, 50}_0 ∧ true) 
c  in CNF:
c    -b^{5, 50}_2 ∨  b^{5, 50}_1 ∨  b^{5, 50}_0 ∨ false 
c  in DIMACS:
-8576  8577  8578  0

c  3 does not represent an automaton state.
c    -(-b^{5, 50}_2 ∧  b^{5, 50}_1 ∧  b^{5, 50}_0 ∧ true) 
c  in CNF:
c     b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ false 
c  in DIMACS:
 8576 -8577 -8578  0
c  -3 does not represent an automaton state.
c    -( b^{5, 50}_2 ∧  b^{5, 50}_1 ∧  b^{5, 50}_0 ∧ true) 
c  in CNF:
c    -b^{5, 50}_2 ∨ -b^{5, 50}_1 ∨ -b^{5, 50}_0 ∨ false 
c  in DIMACS:
-8576 -8577 -8578  0

c i = 51
c  -2+1 --> -1
c    ( b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧  p_255) -> ( b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0)
c  in CNF:
c    -b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨  b^{5, 52}_2
c    -b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_1
c    -b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨  b^{5, 52}_0
c  in DIMACS:
-8579 -8580  8581 -255  8582 0
-8579 -8580  8581 -255 -8583 0
-8579 -8580  8581 -255  8584 0

c  -1+1 --> 0
c    ( b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0 ∧  p_255) -> (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧ -b^{5, 52}_0)
c  in CNF:
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_2
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_1
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_0
c  in DIMACS:
-8579  8580 -8581 -255 -8582 0
-8579  8580 -8581 -255 -8583 0
-8579  8580 -8581 -255 -8584 0

c  0+1 --> 1
c    (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧  p_255) -> (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0)
c  in CNF:
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_2
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_1
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨  b^{5, 52}_0
c  in DIMACS:
 8579  8580  8581 -255 -8582 0
 8579  8580  8581 -255 -8583 0
 8579  8580  8581 -255  8584 0

c  1+1 --> 2
c    (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0 ∧  p_255) -> (-b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0)
c  in CNF:
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_2
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨  b^{5, 52}_1
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ -p_255 ∨ -b^{5, 52}_0
c  in DIMACS:
 8579  8580 -8581 -255 -8582 0
 8579  8580 -8581 -255  8583 0
 8579  8580 -8581 -255 -8584 0

c  2+1 --> break 
c    (-b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧  p_255) -> break
c  in CNF:
c     b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 8579 -8580  8581 -255 1162 0


c  2-1 --> 1
c    (-b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧ -p_255) -> (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0)
c  in CNF:
c     b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_2
c     b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_1
c     b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨  b^{5, 52}_0
c  in DIMACS:
 8579 -8580  8581  255 -8582 0
 8579 -8580  8581  255 -8583 0
 8579 -8580  8581  255  8584 0

c  1-1 --> 0
c    (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0 ∧ -p_255) -> (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧ -b^{5, 52}_0)
c  in CNF:
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_2
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_1
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_0
c  in DIMACS:
 8579  8580 -8581  255 -8582 0
 8579  8580 -8581  255 -8583 0
 8579  8580 -8581  255 -8584 0

c  0-1 --> -1
c    (-b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧ -p_255) -> ( b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0)
c  in CNF:
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨  b^{5, 52}_2
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_1
c     b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨  b^{5, 52}_0
c  in DIMACS:
 8579  8580  8581  255  8582 0
 8579  8580  8581  255 -8583 0
 8579  8580  8581  255  8584 0

c  -1-1 --> -2
c    ( b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧  b^{5, 51}_0 ∧ -p_255) -> ( b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0)
c  in CNF:
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨  b^{5, 52}_2
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨  b^{5, 52}_1
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨  p_255 ∨ -b^{5, 52}_0
c  in DIMACS:
-8579  8580 -8581  255  8582 0
-8579  8580 -8581  255  8583 0
-8579  8580 -8581  255 -8584 0

c  -2-1 --> break 
c    ( b^{5, 51}_2 ∧  b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨  b^{5, 51}_0 ∨  p_255 ∨ break
c  in DIMACS:
-8579 -8580  8581  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 51}_2 ∧ -b^{5, 51}_1 ∧ -b^{5, 51}_0 ∧ true) 
c  in CNF:
c    -b^{5, 51}_2 ∨  b^{5, 51}_1 ∨  b^{5, 51}_0 ∨ false 
c  in DIMACS:
-8579  8580  8581  0

c  3 does not represent an automaton state.
c    -(-b^{5, 51}_2 ∧  b^{5, 51}_1 ∧  b^{5, 51}_0 ∧ true) 
c  in CNF:
c     b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ false 
c  in DIMACS:
 8579 -8580 -8581  0
c  -3 does not represent an automaton state.
c    -( b^{5, 51}_2 ∧  b^{5, 51}_1 ∧  b^{5, 51}_0 ∧ true) 
c  in CNF:
c    -b^{5, 51}_2 ∨ -b^{5, 51}_1 ∨ -b^{5, 51}_0 ∨ false 
c  in DIMACS:
-8579 -8580 -8581  0

c i = 52
c  -2+1 --> -1
c    ( b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧  p_260) -> ( b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0)
c  in CNF:
c    -b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨  b^{5, 53}_2
c    -b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_1
c    -b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨  b^{5, 53}_0
c  in DIMACS:
-8582 -8583  8584 -260  8585 0
-8582 -8583  8584 -260 -8586 0
-8582 -8583  8584 -260  8587 0

c  -1+1 --> 0
c    ( b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0 ∧  p_260) -> (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧ -b^{5, 53}_0)
c  in CNF:
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_2
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_1
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_0
c  in DIMACS:
-8582  8583 -8584 -260 -8585 0
-8582  8583 -8584 -260 -8586 0
-8582  8583 -8584 -260 -8587 0

c  0+1 --> 1
c    (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧  p_260) -> (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0)
c  in CNF:
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_2
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_1
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨  b^{5, 53}_0
c  in DIMACS:
 8582  8583  8584 -260 -8585 0
 8582  8583  8584 -260 -8586 0
 8582  8583  8584 -260  8587 0

c  1+1 --> 2
c    (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0 ∧  p_260) -> (-b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0)
c  in CNF:
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_2
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨  b^{5, 53}_1
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ -p_260 ∨ -b^{5, 53}_0
c  in DIMACS:
 8582  8583 -8584 -260 -8585 0
 8582  8583 -8584 -260  8586 0
 8582  8583 -8584 -260 -8587 0

c  2+1 --> break 
c    (-b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧  p_260) -> break
c  in CNF:
c     b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 8582 -8583  8584 -260 1162 0


c  2-1 --> 1
c    (-b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧ -p_260) -> (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0)
c  in CNF:
c     b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_2
c     b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_1
c     b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨  b^{5, 53}_0
c  in DIMACS:
 8582 -8583  8584  260 -8585 0
 8582 -8583  8584  260 -8586 0
 8582 -8583  8584  260  8587 0

c  1-1 --> 0
c    (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0 ∧ -p_260) -> (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧ -b^{5, 53}_0)
c  in CNF:
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_2
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_1
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_0
c  in DIMACS:
 8582  8583 -8584  260 -8585 0
 8582  8583 -8584  260 -8586 0
 8582  8583 -8584  260 -8587 0

c  0-1 --> -1
c    (-b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧ -p_260) -> ( b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0)
c  in CNF:
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨  b^{5, 53}_2
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_1
c     b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨  b^{5, 53}_0
c  in DIMACS:
 8582  8583  8584  260  8585 0
 8582  8583  8584  260 -8586 0
 8582  8583  8584  260  8587 0

c  -1-1 --> -2
c    ( b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧  b^{5, 52}_0 ∧ -p_260) -> ( b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0)
c  in CNF:
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨  b^{5, 53}_2
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨  b^{5, 53}_1
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨  p_260 ∨ -b^{5, 53}_0
c  in DIMACS:
-8582  8583 -8584  260  8585 0
-8582  8583 -8584  260  8586 0
-8582  8583 -8584  260 -8587 0

c  -2-1 --> break 
c    ( b^{5, 52}_2 ∧  b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨  b^{5, 52}_0 ∨  p_260 ∨ break
c  in DIMACS:
-8582 -8583  8584  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 52}_2 ∧ -b^{5, 52}_1 ∧ -b^{5, 52}_0 ∧ true) 
c  in CNF:
c    -b^{5, 52}_2 ∨  b^{5, 52}_1 ∨  b^{5, 52}_0 ∨ false 
c  in DIMACS:
-8582  8583  8584  0

c  3 does not represent an automaton state.
c    -(-b^{5, 52}_2 ∧  b^{5, 52}_1 ∧  b^{5, 52}_0 ∧ true) 
c  in CNF:
c     b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ false 
c  in DIMACS:
 8582 -8583 -8584  0
c  -3 does not represent an automaton state.
c    -( b^{5, 52}_2 ∧  b^{5, 52}_1 ∧  b^{5, 52}_0 ∧ true) 
c  in CNF:
c    -b^{5, 52}_2 ∨ -b^{5, 52}_1 ∨ -b^{5, 52}_0 ∨ false 
c  in DIMACS:
-8582 -8583 -8584  0

c i = 53
c  -2+1 --> -1
c    ( b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧  p_265) -> ( b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0)
c  in CNF:
c    -b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨  b^{5, 54}_2
c    -b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_1
c    -b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨  b^{5, 54}_0
c  in DIMACS:
-8585 -8586  8587 -265  8588 0
-8585 -8586  8587 -265 -8589 0
-8585 -8586  8587 -265  8590 0

c  -1+1 --> 0
c    ( b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0 ∧  p_265) -> (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧ -b^{5, 54}_0)
c  in CNF:
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_2
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_1
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_0
c  in DIMACS:
-8585  8586 -8587 -265 -8588 0
-8585  8586 -8587 -265 -8589 0
-8585  8586 -8587 -265 -8590 0

c  0+1 --> 1
c    (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧  p_265) -> (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0)
c  in CNF:
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_2
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_1
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨  b^{5, 54}_0
c  in DIMACS:
 8585  8586  8587 -265 -8588 0
 8585  8586  8587 -265 -8589 0
 8585  8586  8587 -265  8590 0

c  1+1 --> 2
c    (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0 ∧  p_265) -> (-b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0)
c  in CNF:
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_2
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨  b^{5, 54}_1
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ -p_265 ∨ -b^{5, 54}_0
c  in DIMACS:
 8585  8586 -8587 -265 -8588 0
 8585  8586 -8587 -265  8589 0
 8585  8586 -8587 -265 -8590 0

c  2+1 --> break 
c    (-b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧  p_265) -> break
c  in CNF:
c     b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ -p_265 ∨ break
c  in DIMACS:
 8585 -8586  8587 -265 1162 0


c  2-1 --> 1
c    (-b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧ -p_265) -> (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0)
c  in CNF:
c     b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_2
c     b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_1
c     b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨  b^{5, 54}_0
c  in DIMACS:
 8585 -8586  8587  265 -8588 0
 8585 -8586  8587  265 -8589 0
 8585 -8586  8587  265  8590 0

c  1-1 --> 0
c    (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0 ∧ -p_265) -> (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧ -b^{5, 54}_0)
c  in CNF:
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_2
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_1
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_0
c  in DIMACS:
 8585  8586 -8587  265 -8588 0
 8585  8586 -8587  265 -8589 0
 8585  8586 -8587  265 -8590 0

c  0-1 --> -1
c    (-b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧ -p_265) -> ( b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0)
c  in CNF:
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨  b^{5, 54}_2
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_1
c     b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨  b^{5, 54}_0
c  in DIMACS:
 8585  8586  8587  265  8588 0
 8585  8586  8587  265 -8589 0
 8585  8586  8587  265  8590 0

c  -1-1 --> -2
c    ( b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧  b^{5, 53}_0 ∧ -p_265) -> ( b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0)
c  in CNF:
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨  b^{5, 54}_2
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨  b^{5, 54}_1
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨  p_265 ∨ -b^{5, 54}_0
c  in DIMACS:
-8585  8586 -8587  265  8588 0
-8585  8586 -8587  265  8589 0
-8585  8586 -8587  265 -8590 0

c  -2-1 --> break 
c    ( b^{5, 53}_2 ∧  b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧ -p_265) -> break
c  in CNF:
c    -b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨  b^{5, 53}_0 ∨  p_265 ∨ break
c  in DIMACS:
-8585 -8586  8587  265 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 53}_2 ∧ -b^{5, 53}_1 ∧ -b^{5, 53}_0 ∧ true) 
c  in CNF:
c    -b^{5, 53}_2 ∨  b^{5, 53}_1 ∨  b^{5, 53}_0 ∨ false 
c  in DIMACS:
-8585  8586  8587  0

c  3 does not represent an automaton state.
c    -(-b^{5, 53}_2 ∧  b^{5, 53}_1 ∧  b^{5, 53}_0 ∧ true) 
c  in CNF:
c     b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ false 
c  in DIMACS:
 8585 -8586 -8587  0
c  -3 does not represent an automaton state.
c    -( b^{5, 53}_2 ∧  b^{5, 53}_1 ∧  b^{5, 53}_0 ∧ true) 
c  in CNF:
c    -b^{5, 53}_2 ∨ -b^{5, 53}_1 ∨ -b^{5, 53}_0 ∨ false 
c  in DIMACS:
-8585 -8586 -8587  0

c i = 54
c  -2+1 --> -1
c    ( b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧  p_270) -> ( b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0)
c  in CNF:
c    -b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨  b^{5, 55}_2
c    -b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_1
c    -b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨  b^{5, 55}_0
c  in DIMACS:
-8588 -8589  8590 -270  8591 0
-8588 -8589  8590 -270 -8592 0
-8588 -8589  8590 -270  8593 0

c  -1+1 --> 0
c    ( b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0 ∧  p_270) -> (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧ -b^{5, 55}_0)
c  in CNF:
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_2
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_1
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_0
c  in DIMACS:
-8588  8589 -8590 -270 -8591 0
-8588  8589 -8590 -270 -8592 0
-8588  8589 -8590 -270 -8593 0

c  0+1 --> 1
c    (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧  p_270) -> (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0)
c  in CNF:
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_2
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_1
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨  b^{5, 55}_0
c  in DIMACS:
 8588  8589  8590 -270 -8591 0
 8588  8589  8590 -270 -8592 0
 8588  8589  8590 -270  8593 0

c  1+1 --> 2
c    (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0 ∧  p_270) -> (-b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0)
c  in CNF:
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_2
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨  b^{5, 55}_1
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ -p_270 ∨ -b^{5, 55}_0
c  in DIMACS:
 8588  8589 -8590 -270 -8591 0
 8588  8589 -8590 -270  8592 0
 8588  8589 -8590 -270 -8593 0

c  2+1 --> break 
c    (-b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧  p_270) -> break
c  in CNF:
c     b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 8588 -8589  8590 -270 1162 0


c  2-1 --> 1
c    (-b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧ -p_270) -> (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0)
c  in CNF:
c     b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_2
c     b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_1
c     b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨  b^{5, 55}_0
c  in DIMACS:
 8588 -8589  8590  270 -8591 0
 8588 -8589  8590  270 -8592 0
 8588 -8589  8590  270  8593 0

c  1-1 --> 0
c    (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0 ∧ -p_270) -> (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧ -b^{5, 55}_0)
c  in CNF:
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_2
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_1
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_0
c  in DIMACS:
 8588  8589 -8590  270 -8591 0
 8588  8589 -8590  270 -8592 0
 8588  8589 -8590  270 -8593 0

c  0-1 --> -1
c    (-b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧ -p_270) -> ( b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0)
c  in CNF:
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨  b^{5, 55}_2
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_1
c     b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨  b^{5, 55}_0
c  in DIMACS:
 8588  8589  8590  270  8591 0
 8588  8589  8590  270 -8592 0
 8588  8589  8590  270  8593 0

c  -1-1 --> -2
c    ( b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧  b^{5, 54}_0 ∧ -p_270) -> ( b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0)
c  in CNF:
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨  b^{5, 55}_2
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨  b^{5, 55}_1
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨  p_270 ∨ -b^{5, 55}_0
c  in DIMACS:
-8588  8589 -8590  270  8591 0
-8588  8589 -8590  270  8592 0
-8588  8589 -8590  270 -8593 0

c  -2-1 --> break 
c    ( b^{5, 54}_2 ∧  b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨  b^{5, 54}_0 ∨  p_270 ∨ break
c  in DIMACS:
-8588 -8589  8590  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 54}_2 ∧ -b^{5, 54}_1 ∧ -b^{5, 54}_0 ∧ true) 
c  in CNF:
c    -b^{5, 54}_2 ∨  b^{5, 54}_1 ∨  b^{5, 54}_0 ∨ false 
c  in DIMACS:
-8588  8589  8590  0

c  3 does not represent an automaton state.
c    -(-b^{5, 54}_2 ∧  b^{5, 54}_1 ∧  b^{5, 54}_0 ∧ true) 
c  in CNF:
c     b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ false 
c  in DIMACS:
 8588 -8589 -8590  0
c  -3 does not represent an automaton state.
c    -( b^{5, 54}_2 ∧  b^{5, 54}_1 ∧  b^{5, 54}_0 ∧ true) 
c  in CNF:
c    -b^{5, 54}_2 ∨ -b^{5, 54}_1 ∨ -b^{5, 54}_0 ∨ false 
c  in DIMACS:
-8588 -8589 -8590  0

c i = 55
c  -2+1 --> -1
c    ( b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧  p_275) -> ( b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0)
c  in CNF:
c    -b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨  b^{5, 56}_2
c    -b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_1
c    -b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨  b^{5, 56}_0
c  in DIMACS:
-8591 -8592  8593 -275  8594 0
-8591 -8592  8593 -275 -8595 0
-8591 -8592  8593 -275  8596 0

c  -1+1 --> 0
c    ( b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0 ∧  p_275) -> (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧ -b^{5, 56}_0)
c  in CNF:
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_2
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_1
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_0
c  in DIMACS:
-8591  8592 -8593 -275 -8594 0
-8591  8592 -8593 -275 -8595 0
-8591  8592 -8593 -275 -8596 0

c  0+1 --> 1
c    (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧  p_275) -> (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0)
c  in CNF:
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_2
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_1
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨  b^{5, 56}_0
c  in DIMACS:
 8591  8592  8593 -275 -8594 0
 8591  8592  8593 -275 -8595 0
 8591  8592  8593 -275  8596 0

c  1+1 --> 2
c    (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0 ∧  p_275) -> (-b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0)
c  in CNF:
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_2
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨  b^{5, 56}_1
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ -p_275 ∨ -b^{5, 56}_0
c  in DIMACS:
 8591  8592 -8593 -275 -8594 0
 8591  8592 -8593 -275  8595 0
 8591  8592 -8593 -275 -8596 0

c  2+1 --> break 
c    (-b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧  p_275) -> break
c  in CNF:
c     b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 8591 -8592  8593 -275 1162 0


c  2-1 --> 1
c    (-b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧ -p_275) -> (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0)
c  in CNF:
c     b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_2
c     b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_1
c     b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨  b^{5, 56}_0
c  in DIMACS:
 8591 -8592  8593  275 -8594 0
 8591 -8592  8593  275 -8595 0
 8591 -8592  8593  275  8596 0

c  1-1 --> 0
c    (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0 ∧ -p_275) -> (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧ -b^{5, 56}_0)
c  in CNF:
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_2
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_1
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_0
c  in DIMACS:
 8591  8592 -8593  275 -8594 0
 8591  8592 -8593  275 -8595 0
 8591  8592 -8593  275 -8596 0

c  0-1 --> -1
c    (-b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧ -p_275) -> ( b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0)
c  in CNF:
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨  b^{5, 56}_2
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_1
c     b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨  b^{5, 56}_0
c  in DIMACS:
 8591  8592  8593  275  8594 0
 8591  8592  8593  275 -8595 0
 8591  8592  8593  275  8596 0

c  -1-1 --> -2
c    ( b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧  b^{5, 55}_0 ∧ -p_275) -> ( b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0)
c  in CNF:
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨  b^{5, 56}_2
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨  b^{5, 56}_1
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨  p_275 ∨ -b^{5, 56}_0
c  in DIMACS:
-8591  8592 -8593  275  8594 0
-8591  8592 -8593  275  8595 0
-8591  8592 -8593  275 -8596 0

c  -2-1 --> break 
c    ( b^{5, 55}_2 ∧  b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨  b^{5, 55}_0 ∨  p_275 ∨ break
c  in DIMACS:
-8591 -8592  8593  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 55}_2 ∧ -b^{5, 55}_1 ∧ -b^{5, 55}_0 ∧ true) 
c  in CNF:
c    -b^{5, 55}_2 ∨  b^{5, 55}_1 ∨  b^{5, 55}_0 ∨ false 
c  in DIMACS:
-8591  8592  8593  0

c  3 does not represent an automaton state.
c    -(-b^{5, 55}_2 ∧  b^{5, 55}_1 ∧  b^{5, 55}_0 ∧ true) 
c  in CNF:
c     b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ false 
c  in DIMACS:
 8591 -8592 -8593  0
c  -3 does not represent an automaton state.
c    -( b^{5, 55}_2 ∧  b^{5, 55}_1 ∧  b^{5, 55}_0 ∧ true) 
c  in CNF:
c    -b^{5, 55}_2 ∨ -b^{5, 55}_1 ∨ -b^{5, 55}_0 ∨ false 
c  in DIMACS:
-8591 -8592 -8593  0

c i = 56
c  -2+1 --> -1
c    ( b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧  p_280) -> ( b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0)
c  in CNF:
c    -b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨  b^{5, 57}_2
c    -b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_1
c    -b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨  b^{5, 57}_0
c  in DIMACS:
-8594 -8595  8596 -280  8597 0
-8594 -8595  8596 -280 -8598 0
-8594 -8595  8596 -280  8599 0

c  -1+1 --> 0
c    ( b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0 ∧  p_280) -> (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧ -b^{5, 57}_0)
c  in CNF:
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_2
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_1
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_0
c  in DIMACS:
-8594  8595 -8596 -280 -8597 0
-8594  8595 -8596 -280 -8598 0
-8594  8595 -8596 -280 -8599 0

c  0+1 --> 1
c    (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧  p_280) -> (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0)
c  in CNF:
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_2
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_1
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨  b^{5, 57}_0
c  in DIMACS:
 8594  8595  8596 -280 -8597 0
 8594  8595  8596 -280 -8598 0
 8594  8595  8596 -280  8599 0

c  1+1 --> 2
c    (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0 ∧  p_280) -> (-b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0)
c  in CNF:
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_2
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨  b^{5, 57}_1
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ -p_280 ∨ -b^{5, 57}_0
c  in DIMACS:
 8594  8595 -8596 -280 -8597 0
 8594  8595 -8596 -280  8598 0
 8594  8595 -8596 -280 -8599 0

c  2+1 --> break 
c    (-b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧  p_280) -> break
c  in CNF:
c     b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 8594 -8595  8596 -280 1162 0


c  2-1 --> 1
c    (-b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧ -p_280) -> (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0)
c  in CNF:
c     b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_2
c     b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_1
c     b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨  b^{5, 57}_0
c  in DIMACS:
 8594 -8595  8596  280 -8597 0
 8594 -8595  8596  280 -8598 0
 8594 -8595  8596  280  8599 0

c  1-1 --> 0
c    (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0 ∧ -p_280) -> (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧ -b^{5, 57}_0)
c  in CNF:
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_2
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_1
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_0
c  in DIMACS:
 8594  8595 -8596  280 -8597 0
 8594  8595 -8596  280 -8598 0
 8594  8595 -8596  280 -8599 0

c  0-1 --> -1
c    (-b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧ -p_280) -> ( b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0)
c  in CNF:
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨  b^{5, 57}_2
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_1
c     b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨  b^{5, 57}_0
c  in DIMACS:
 8594  8595  8596  280  8597 0
 8594  8595  8596  280 -8598 0
 8594  8595  8596  280  8599 0

c  -1-1 --> -2
c    ( b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧  b^{5, 56}_0 ∧ -p_280) -> ( b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0)
c  in CNF:
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨  b^{5, 57}_2
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨  b^{5, 57}_1
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨  p_280 ∨ -b^{5, 57}_0
c  in DIMACS:
-8594  8595 -8596  280  8597 0
-8594  8595 -8596  280  8598 0
-8594  8595 -8596  280 -8599 0

c  -2-1 --> break 
c    ( b^{5, 56}_2 ∧  b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨  b^{5, 56}_0 ∨  p_280 ∨ break
c  in DIMACS:
-8594 -8595  8596  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 56}_2 ∧ -b^{5, 56}_1 ∧ -b^{5, 56}_0 ∧ true) 
c  in CNF:
c    -b^{5, 56}_2 ∨  b^{5, 56}_1 ∨  b^{5, 56}_0 ∨ false 
c  in DIMACS:
-8594  8595  8596  0

c  3 does not represent an automaton state.
c    -(-b^{5, 56}_2 ∧  b^{5, 56}_1 ∧  b^{5, 56}_0 ∧ true) 
c  in CNF:
c     b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ false 
c  in DIMACS:
 8594 -8595 -8596  0
c  -3 does not represent an automaton state.
c    -( b^{5, 56}_2 ∧  b^{5, 56}_1 ∧  b^{5, 56}_0 ∧ true) 
c  in CNF:
c    -b^{5, 56}_2 ∨ -b^{5, 56}_1 ∨ -b^{5, 56}_0 ∨ false 
c  in DIMACS:
-8594 -8595 -8596  0

c i = 57
c  -2+1 --> -1
c    ( b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧  p_285) -> ( b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0)
c  in CNF:
c    -b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨  b^{5, 58}_2
c    -b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_1
c    -b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨  b^{5, 58}_0
c  in DIMACS:
-8597 -8598  8599 -285  8600 0
-8597 -8598  8599 -285 -8601 0
-8597 -8598  8599 -285  8602 0

c  -1+1 --> 0
c    ( b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0 ∧  p_285) -> (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧ -b^{5, 58}_0)
c  in CNF:
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_2
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_1
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_0
c  in DIMACS:
-8597  8598 -8599 -285 -8600 0
-8597  8598 -8599 -285 -8601 0
-8597  8598 -8599 -285 -8602 0

c  0+1 --> 1
c    (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧  p_285) -> (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0)
c  in CNF:
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_2
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_1
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨  b^{5, 58}_0
c  in DIMACS:
 8597  8598  8599 -285 -8600 0
 8597  8598  8599 -285 -8601 0
 8597  8598  8599 -285  8602 0

c  1+1 --> 2
c    (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0 ∧  p_285) -> (-b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0)
c  in CNF:
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_2
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨  b^{5, 58}_1
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ -p_285 ∨ -b^{5, 58}_0
c  in DIMACS:
 8597  8598 -8599 -285 -8600 0
 8597  8598 -8599 -285  8601 0
 8597  8598 -8599 -285 -8602 0

c  2+1 --> break 
c    (-b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧  p_285) -> break
c  in CNF:
c     b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 8597 -8598  8599 -285 1162 0


c  2-1 --> 1
c    (-b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧ -p_285) -> (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0)
c  in CNF:
c     b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_2
c     b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_1
c     b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨  b^{5, 58}_0
c  in DIMACS:
 8597 -8598  8599  285 -8600 0
 8597 -8598  8599  285 -8601 0
 8597 -8598  8599  285  8602 0

c  1-1 --> 0
c    (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0 ∧ -p_285) -> (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧ -b^{5, 58}_0)
c  in CNF:
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_2
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_1
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_0
c  in DIMACS:
 8597  8598 -8599  285 -8600 0
 8597  8598 -8599  285 -8601 0
 8597  8598 -8599  285 -8602 0

c  0-1 --> -1
c    (-b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧ -p_285) -> ( b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0)
c  in CNF:
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨  b^{5, 58}_2
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_1
c     b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨  b^{5, 58}_0
c  in DIMACS:
 8597  8598  8599  285  8600 0
 8597  8598  8599  285 -8601 0
 8597  8598  8599  285  8602 0

c  -1-1 --> -2
c    ( b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧  b^{5, 57}_0 ∧ -p_285) -> ( b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0)
c  in CNF:
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨  b^{5, 58}_2
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨  b^{5, 58}_1
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨  p_285 ∨ -b^{5, 58}_0
c  in DIMACS:
-8597  8598 -8599  285  8600 0
-8597  8598 -8599  285  8601 0
-8597  8598 -8599  285 -8602 0

c  -2-1 --> break 
c    ( b^{5, 57}_2 ∧  b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨  b^{5, 57}_0 ∨  p_285 ∨ break
c  in DIMACS:
-8597 -8598  8599  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 57}_2 ∧ -b^{5, 57}_1 ∧ -b^{5, 57}_0 ∧ true) 
c  in CNF:
c    -b^{5, 57}_2 ∨  b^{5, 57}_1 ∨  b^{5, 57}_0 ∨ false 
c  in DIMACS:
-8597  8598  8599  0

c  3 does not represent an automaton state.
c    -(-b^{5, 57}_2 ∧  b^{5, 57}_1 ∧  b^{5, 57}_0 ∧ true) 
c  in CNF:
c     b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ false 
c  in DIMACS:
 8597 -8598 -8599  0
c  -3 does not represent an automaton state.
c    -( b^{5, 57}_2 ∧  b^{5, 57}_1 ∧  b^{5, 57}_0 ∧ true) 
c  in CNF:
c    -b^{5, 57}_2 ∨ -b^{5, 57}_1 ∨ -b^{5, 57}_0 ∨ false 
c  in DIMACS:
-8597 -8598 -8599  0

c i = 58
c  -2+1 --> -1
c    ( b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧  p_290) -> ( b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0)
c  in CNF:
c    -b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨  b^{5, 59}_2
c    -b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_1
c    -b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨  b^{5, 59}_0
c  in DIMACS:
-8600 -8601  8602 -290  8603 0
-8600 -8601  8602 -290 -8604 0
-8600 -8601  8602 -290  8605 0

c  -1+1 --> 0
c    ( b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0 ∧  p_290) -> (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧ -b^{5, 59}_0)
c  in CNF:
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_2
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_1
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_0
c  in DIMACS:
-8600  8601 -8602 -290 -8603 0
-8600  8601 -8602 -290 -8604 0
-8600  8601 -8602 -290 -8605 0

c  0+1 --> 1
c    (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧  p_290) -> (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0)
c  in CNF:
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_2
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_1
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨  b^{5, 59}_0
c  in DIMACS:
 8600  8601  8602 -290 -8603 0
 8600  8601  8602 -290 -8604 0
 8600  8601  8602 -290  8605 0

c  1+1 --> 2
c    (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0 ∧  p_290) -> (-b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0)
c  in CNF:
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_2
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨  b^{5, 59}_1
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ -p_290 ∨ -b^{5, 59}_0
c  in DIMACS:
 8600  8601 -8602 -290 -8603 0
 8600  8601 -8602 -290  8604 0
 8600  8601 -8602 -290 -8605 0

c  2+1 --> break 
c    (-b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧  p_290) -> break
c  in CNF:
c     b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 8600 -8601  8602 -290 1162 0


c  2-1 --> 1
c    (-b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧ -p_290) -> (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0)
c  in CNF:
c     b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_2
c     b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_1
c     b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨  b^{5, 59}_0
c  in DIMACS:
 8600 -8601  8602  290 -8603 0
 8600 -8601  8602  290 -8604 0
 8600 -8601  8602  290  8605 0

c  1-1 --> 0
c    (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0 ∧ -p_290) -> (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧ -b^{5, 59}_0)
c  in CNF:
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_2
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_1
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_0
c  in DIMACS:
 8600  8601 -8602  290 -8603 0
 8600  8601 -8602  290 -8604 0
 8600  8601 -8602  290 -8605 0

c  0-1 --> -1
c    (-b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧ -p_290) -> ( b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0)
c  in CNF:
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨  b^{5, 59}_2
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_1
c     b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨  b^{5, 59}_0
c  in DIMACS:
 8600  8601  8602  290  8603 0
 8600  8601  8602  290 -8604 0
 8600  8601  8602  290  8605 0

c  -1-1 --> -2
c    ( b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧  b^{5, 58}_0 ∧ -p_290) -> ( b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0)
c  in CNF:
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨  b^{5, 59}_2
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨  b^{5, 59}_1
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨  p_290 ∨ -b^{5, 59}_0
c  in DIMACS:
-8600  8601 -8602  290  8603 0
-8600  8601 -8602  290  8604 0
-8600  8601 -8602  290 -8605 0

c  -2-1 --> break 
c    ( b^{5, 58}_2 ∧  b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨  b^{5, 58}_0 ∨  p_290 ∨ break
c  in DIMACS:
-8600 -8601  8602  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 58}_2 ∧ -b^{5, 58}_1 ∧ -b^{5, 58}_0 ∧ true) 
c  in CNF:
c    -b^{5, 58}_2 ∨  b^{5, 58}_1 ∨  b^{5, 58}_0 ∨ false 
c  in DIMACS:
-8600  8601  8602  0

c  3 does not represent an automaton state.
c    -(-b^{5, 58}_2 ∧  b^{5, 58}_1 ∧  b^{5, 58}_0 ∧ true) 
c  in CNF:
c     b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ false 
c  in DIMACS:
 8600 -8601 -8602  0
c  -3 does not represent an automaton state.
c    -( b^{5, 58}_2 ∧  b^{5, 58}_1 ∧  b^{5, 58}_0 ∧ true) 
c  in CNF:
c    -b^{5, 58}_2 ∨ -b^{5, 58}_1 ∨ -b^{5, 58}_0 ∨ false 
c  in DIMACS:
-8600 -8601 -8602  0

c i = 59
c  -2+1 --> -1
c    ( b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧  p_295) -> ( b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0)
c  in CNF:
c    -b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨  b^{5, 60}_2
c    -b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_1
c    -b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨  b^{5, 60}_0
c  in DIMACS:
-8603 -8604  8605 -295  8606 0
-8603 -8604  8605 -295 -8607 0
-8603 -8604  8605 -295  8608 0

c  -1+1 --> 0
c    ( b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0 ∧  p_295) -> (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧ -b^{5, 60}_0)
c  in CNF:
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_2
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_1
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_0
c  in DIMACS:
-8603  8604 -8605 -295 -8606 0
-8603  8604 -8605 -295 -8607 0
-8603  8604 -8605 -295 -8608 0

c  0+1 --> 1
c    (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧  p_295) -> (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0)
c  in CNF:
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_2
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_1
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨  b^{5, 60}_0
c  in DIMACS:
 8603  8604  8605 -295 -8606 0
 8603  8604  8605 -295 -8607 0
 8603  8604  8605 -295  8608 0

c  1+1 --> 2
c    (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0 ∧  p_295) -> (-b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0)
c  in CNF:
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_2
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨  b^{5, 60}_1
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ -p_295 ∨ -b^{5, 60}_0
c  in DIMACS:
 8603  8604 -8605 -295 -8606 0
 8603  8604 -8605 -295  8607 0
 8603  8604 -8605 -295 -8608 0

c  2+1 --> break 
c    (-b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧  p_295) -> break
c  in CNF:
c     b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ -p_295 ∨ break
c  in DIMACS:
 8603 -8604  8605 -295 1162 0


c  2-1 --> 1
c    (-b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧ -p_295) -> (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0)
c  in CNF:
c     b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_2
c     b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_1
c     b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨  b^{5, 60}_0
c  in DIMACS:
 8603 -8604  8605  295 -8606 0
 8603 -8604  8605  295 -8607 0
 8603 -8604  8605  295  8608 0

c  1-1 --> 0
c    (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0 ∧ -p_295) -> (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧ -b^{5, 60}_0)
c  in CNF:
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_2
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_1
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_0
c  in DIMACS:
 8603  8604 -8605  295 -8606 0
 8603  8604 -8605  295 -8607 0
 8603  8604 -8605  295 -8608 0

c  0-1 --> -1
c    (-b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧ -p_295) -> ( b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0)
c  in CNF:
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨  b^{5, 60}_2
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_1
c     b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨  b^{5, 60}_0
c  in DIMACS:
 8603  8604  8605  295  8606 0
 8603  8604  8605  295 -8607 0
 8603  8604  8605  295  8608 0

c  -1-1 --> -2
c    ( b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧  b^{5, 59}_0 ∧ -p_295) -> ( b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0)
c  in CNF:
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨  b^{5, 60}_2
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨  b^{5, 60}_1
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨  p_295 ∨ -b^{5, 60}_0
c  in DIMACS:
-8603  8604 -8605  295  8606 0
-8603  8604 -8605  295  8607 0
-8603  8604 -8605  295 -8608 0

c  -2-1 --> break 
c    ( b^{5, 59}_2 ∧  b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧ -p_295) -> break
c  in CNF:
c    -b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨  b^{5, 59}_0 ∨  p_295 ∨ break
c  in DIMACS:
-8603 -8604  8605  295 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 59}_2 ∧ -b^{5, 59}_1 ∧ -b^{5, 59}_0 ∧ true) 
c  in CNF:
c    -b^{5, 59}_2 ∨  b^{5, 59}_1 ∨  b^{5, 59}_0 ∨ false 
c  in DIMACS:
-8603  8604  8605  0

c  3 does not represent an automaton state.
c    -(-b^{5, 59}_2 ∧  b^{5, 59}_1 ∧  b^{5, 59}_0 ∧ true) 
c  in CNF:
c     b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ false 
c  in DIMACS:
 8603 -8604 -8605  0
c  -3 does not represent an automaton state.
c    -( b^{5, 59}_2 ∧  b^{5, 59}_1 ∧  b^{5, 59}_0 ∧ true) 
c  in CNF:
c    -b^{5, 59}_2 ∨ -b^{5, 59}_1 ∨ -b^{5, 59}_0 ∨ false 
c  in DIMACS:
-8603 -8604 -8605  0

c i = 60
c  -2+1 --> -1
c    ( b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧  p_300) -> ( b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0)
c  in CNF:
c    -b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨  b^{5, 61}_2
c    -b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_1
c    -b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨  b^{5, 61}_0
c  in DIMACS:
-8606 -8607  8608 -300  8609 0
-8606 -8607  8608 -300 -8610 0
-8606 -8607  8608 -300  8611 0

c  -1+1 --> 0
c    ( b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0 ∧  p_300) -> (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧ -b^{5, 61}_0)
c  in CNF:
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_2
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_1
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_0
c  in DIMACS:
-8606  8607 -8608 -300 -8609 0
-8606  8607 -8608 -300 -8610 0
-8606  8607 -8608 -300 -8611 0

c  0+1 --> 1
c    (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧  p_300) -> (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0)
c  in CNF:
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_2
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_1
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨  b^{5, 61}_0
c  in DIMACS:
 8606  8607  8608 -300 -8609 0
 8606  8607  8608 -300 -8610 0
 8606  8607  8608 -300  8611 0

c  1+1 --> 2
c    (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0 ∧  p_300) -> (-b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0)
c  in CNF:
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_2
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨  b^{5, 61}_1
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ -p_300 ∨ -b^{5, 61}_0
c  in DIMACS:
 8606  8607 -8608 -300 -8609 0
 8606  8607 -8608 -300  8610 0
 8606  8607 -8608 -300 -8611 0

c  2+1 --> break 
c    (-b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧  p_300) -> break
c  in CNF:
c     b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 8606 -8607  8608 -300 1162 0


c  2-1 --> 1
c    (-b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧ -p_300) -> (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0)
c  in CNF:
c     b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_2
c     b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_1
c     b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨  b^{5, 61}_0
c  in DIMACS:
 8606 -8607  8608  300 -8609 0
 8606 -8607  8608  300 -8610 0
 8606 -8607  8608  300  8611 0

c  1-1 --> 0
c    (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0 ∧ -p_300) -> (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧ -b^{5, 61}_0)
c  in CNF:
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_2
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_1
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_0
c  in DIMACS:
 8606  8607 -8608  300 -8609 0
 8606  8607 -8608  300 -8610 0
 8606  8607 -8608  300 -8611 0

c  0-1 --> -1
c    (-b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧ -p_300) -> ( b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0)
c  in CNF:
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨  b^{5, 61}_2
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_1
c     b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨  b^{5, 61}_0
c  in DIMACS:
 8606  8607  8608  300  8609 0
 8606  8607  8608  300 -8610 0
 8606  8607  8608  300  8611 0

c  -1-1 --> -2
c    ( b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧  b^{5, 60}_0 ∧ -p_300) -> ( b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0)
c  in CNF:
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨  b^{5, 61}_2
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨  b^{5, 61}_1
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨  p_300 ∨ -b^{5, 61}_0
c  in DIMACS:
-8606  8607 -8608  300  8609 0
-8606  8607 -8608  300  8610 0
-8606  8607 -8608  300 -8611 0

c  -2-1 --> break 
c    ( b^{5, 60}_2 ∧  b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨  b^{5, 60}_0 ∨  p_300 ∨ break
c  in DIMACS:
-8606 -8607  8608  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 60}_2 ∧ -b^{5, 60}_1 ∧ -b^{5, 60}_0 ∧ true) 
c  in CNF:
c    -b^{5, 60}_2 ∨  b^{5, 60}_1 ∨  b^{5, 60}_0 ∨ false 
c  in DIMACS:
-8606  8607  8608  0

c  3 does not represent an automaton state.
c    -(-b^{5, 60}_2 ∧  b^{5, 60}_1 ∧  b^{5, 60}_0 ∧ true) 
c  in CNF:
c     b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ false 
c  in DIMACS:
 8606 -8607 -8608  0
c  -3 does not represent an automaton state.
c    -( b^{5, 60}_2 ∧  b^{5, 60}_1 ∧  b^{5, 60}_0 ∧ true) 
c  in CNF:
c    -b^{5, 60}_2 ∨ -b^{5, 60}_1 ∨ -b^{5, 60}_0 ∨ false 
c  in DIMACS:
-8606 -8607 -8608  0

c i = 61
c  -2+1 --> -1
c    ( b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧  p_305) -> ( b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0)
c  in CNF:
c    -b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨  b^{5, 62}_2
c    -b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_1
c    -b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨  b^{5, 62}_0
c  in DIMACS:
-8609 -8610  8611 -305  8612 0
-8609 -8610  8611 -305 -8613 0
-8609 -8610  8611 -305  8614 0

c  -1+1 --> 0
c    ( b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0 ∧  p_305) -> (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧ -b^{5, 62}_0)
c  in CNF:
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_2
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_1
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_0
c  in DIMACS:
-8609  8610 -8611 -305 -8612 0
-8609  8610 -8611 -305 -8613 0
-8609  8610 -8611 -305 -8614 0

c  0+1 --> 1
c    (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧  p_305) -> (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0)
c  in CNF:
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_2
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_1
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨  b^{5, 62}_0
c  in DIMACS:
 8609  8610  8611 -305 -8612 0
 8609  8610  8611 -305 -8613 0
 8609  8610  8611 -305  8614 0

c  1+1 --> 2
c    (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0 ∧  p_305) -> (-b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0)
c  in CNF:
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_2
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨  b^{5, 62}_1
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ -p_305 ∨ -b^{5, 62}_0
c  in DIMACS:
 8609  8610 -8611 -305 -8612 0
 8609  8610 -8611 -305  8613 0
 8609  8610 -8611 -305 -8614 0

c  2+1 --> break 
c    (-b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧  p_305) -> break
c  in CNF:
c     b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ -p_305 ∨ break
c  in DIMACS:
 8609 -8610  8611 -305 1162 0


c  2-1 --> 1
c    (-b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧ -p_305) -> (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0)
c  in CNF:
c     b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_2
c     b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_1
c     b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨  b^{5, 62}_0
c  in DIMACS:
 8609 -8610  8611  305 -8612 0
 8609 -8610  8611  305 -8613 0
 8609 -8610  8611  305  8614 0

c  1-1 --> 0
c    (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0 ∧ -p_305) -> (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧ -b^{5, 62}_0)
c  in CNF:
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_2
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_1
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_0
c  in DIMACS:
 8609  8610 -8611  305 -8612 0
 8609  8610 -8611  305 -8613 0
 8609  8610 -8611  305 -8614 0

c  0-1 --> -1
c    (-b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧ -p_305) -> ( b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0)
c  in CNF:
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨  b^{5, 62}_2
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_1
c     b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨  b^{5, 62}_0
c  in DIMACS:
 8609  8610  8611  305  8612 0
 8609  8610  8611  305 -8613 0
 8609  8610  8611  305  8614 0

c  -1-1 --> -2
c    ( b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧  b^{5, 61}_0 ∧ -p_305) -> ( b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0)
c  in CNF:
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨  b^{5, 62}_2
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨  b^{5, 62}_1
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨  p_305 ∨ -b^{5, 62}_0
c  in DIMACS:
-8609  8610 -8611  305  8612 0
-8609  8610 -8611  305  8613 0
-8609  8610 -8611  305 -8614 0

c  -2-1 --> break 
c    ( b^{5, 61}_2 ∧  b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧ -p_305) -> break
c  in CNF:
c    -b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨  b^{5, 61}_0 ∨  p_305 ∨ break
c  in DIMACS:
-8609 -8610  8611  305 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 61}_2 ∧ -b^{5, 61}_1 ∧ -b^{5, 61}_0 ∧ true) 
c  in CNF:
c    -b^{5, 61}_2 ∨  b^{5, 61}_1 ∨  b^{5, 61}_0 ∨ false 
c  in DIMACS:
-8609  8610  8611  0

c  3 does not represent an automaton state.
c    -(-b^{5, 61}_2 ∧  b^{5, 61}_1 ∧  b^{5, 61}_0 ∧ true) 
c  in CNF:
c     b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ false 
c  in DIMACS:
 8609 -8610 -8611  0
c  -3 does not represent an automaton state.
c    -( b^{5, 61}_2 ∧  b^{5, 61}_1 ∧  b^{5, 61}_0 ∧ true) 
c  in CNF:
c    -b^{5, 61}_2 ∨ -b^{5, 61}_1 ∨ -b^{5, 61}_0 ∨ false 
c  in DIMACS:
-8609 -8610 -8611  0

c i = 62
c  -2+1 --> -1
c    ( b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧  p_310) -> ( b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0)
c  in CNF:
c    -b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨  b^{5, 63}_2
c    -b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_1
c    -b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨  b^{5, 63}_0
c  in DIMACS:
-8612 -8613  8614 -310  8615 0
-8612 -8613  8614 -310 -8616 0
-8612 -8613  8614 -310  8617 0

c  -1+1 --> 0
c    ( b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0 ∧  p_310) -> (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧ -b^{5, 63}_0)
c  in CNF:
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_2
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_1
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_0
c  in DIMACS:
-8612  8613 -8614 -310 -8615 0
-8612  8613 -8614 -310 -8616 0
-8612  8613 -8614 -310 -8617 0

c  0+1 --> 1
c    (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧  p_310) -> (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0)
c  in CNF:
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_2
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_1
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨  b^{5, 63}_0
c  in DIMACS:
 8612  8613  8614 -310 -8615 0
 8612  8613  8614 -310 -8616 0
 8612  8613  8614 -310  8617 0

c  1+1 --> 2
c    (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0 ∧  p_310) -> (-b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0)
c  in CNF:
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_2
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨  b^{5, 63}_1
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ -p_310 ∨ -b^{5, 63}_0
c  in DIMACS:
 8612  8613 -8614 -310 -8615 0
 8612  8613 -8614 -310  8616 0
 8612  8613 -8614 -310 -8617 0

c  2+1 --> break 
c    (-b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧  p_310) -> break
c  in CNF:
c     b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 8612 -8613  8614 -310 1162 0


c  2-1 --> 1
c    (-b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧ -p_310) -> (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0)
c  in CNF:
c     b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_2
c     b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_1
c     b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨  b^{5, 63}_0
c  in DIMACS:
 8612 -8613  8614  310 -8615 0
 8612 -8613  8614  310 -8616 0
 8612 -8613  8614  310  8617 0

c  1-1 --> 0
c    (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0 ∧ -p_310) -> (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧ -b^{5, 63}_0)
c  in CNF:
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_2
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_1
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_0
c  in DIMACS:
 8612  8613 -8614  310 -8615 0
 8612  8613 -8614  310 -8616 0
 8612  8613 -8614  310 -8617 0

c  0-1 --> -1
c    (-b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧ -p_310) -> ( b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0)
c  in CNF:
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨  b^{5, 63}_2
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_1
c     b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨  b^{5, 63}_0
c  in DIMACS:
 8612  8613  8614  310  8615 0
 8612  8613  8614  310 -8616 0
 8612  8613  8614  310  8617 0

c  -1-1 --> -2
c    ( b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧  b^{5, 62}_0 ∧ -p_310) -> ( b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0)
c  in CNF:
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨  b^{5, 63}_2
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨  b^{5, 63}_1
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨  p_310 ∨ -b^{5, 63}_0
c  in DIMACS:
-8612  8613 -8614  310  8615 0
-8612  8613 -8614  310  8616 0
-8612  8613 -8614  310 -8617 0

c  -2-1 --> break 
c    ( b^{5, 62}_2 ∧  b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨  b^{5, 62}_0 ∨  p_310 ∨ break
c  in DIMACS:
-8612 -8613  8614  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 62}_2 ∧ -b^{5, 62}_1 ∧ -b^{5, 62}_0 ∧ true) 
c  in CNF:
c    -b^{5, 62}_2 ∨  b^{5, 62}_1 ∨  b^{5, 62}_0 ∨ false 
c  in DIMACS:
-8612  8613  8614  0

c  3 does not represent an automaton state.
c    -(-b^{5, 62}_2 ∧  b^{5, 62}_1 ∧  b^{5, 62}_0 ∧ true) 
c  in CNF:
c     b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ false 
c  in DIMACS:
 8612 -8613 -8614  0
c  -3 does not represent an automaton state.
c    -( b^{5, 62}_2 ∧  b^{5, 62}_1 ∧  b^{5, 62}_0 ∧ true) 
c  in CNF:
c    -b^{5, 62}_2 ∨ -b^{5, 62}_1 ∨ -b^{5, 62}_0 ∨ false 
c  in DIMACS:
-8612 -8613 -8614  0

c i = 63
c  -2+1 --> -1
c    ( b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧  p_315) -> ( b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0)
c  in CNF:
c    -b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨  b^{5, 64}_2
c    -b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_1
c    -b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨  b^{5, 64}_0
c  in DIMACS:
-8615 -8616  8617 -315  8618 0
-8615 -8616  8617 -315 -8619 0
-8615 -8616  8617 -315  8620 0

c  -1+1 --> 0
c    ( b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0 ∧  p_315) -> (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧ -b^{5, 64}_0)
c  in CNF:
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_2
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_1
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_0
c  in DIMACS:
-8615  8616 -8617 -315 -8618 0
-8615  8616 -8617 -315 -8619 0
-8615  8616 -8617 -315 -8620 0

c  0+1 --> 1
c    (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧  p_315) -> (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0)
c  in CNF:
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_2
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_1
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨  b^{5, 64}_0
c  in DIMACS:
 8615  8616  8617 -315 -8618 0
 8615  8616  8617 -315 -8619 0
 8615  8616  8617 -315  8620 0

c  1+1 --> 2
c    (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0 ∧  p_315) -> (-b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0)
c  in CNF:
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_2
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨  b^{5, 64}_1
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ -p_315 ∨ -b^{5, 64}_0
c  in DIMACS:
 8615  8616 -8617 -315 -8618 0
 8615  8616 -8617 -315  8619 0
 8615  8616 -8617 -315 -8620 0

c  2+1 --> break 
c    (-b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧  p_315) -> break
c  in CNF:
c     b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 8615 -8616  8617 -315 1162 0


c  2-1 --> 1
c    (-b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧ -p_315) -> (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0)
c  in CNF:
c     b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_2
c     b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_1
c     b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨  b^{5, 64}_0
c  in DIMACS:
 8615 -8616  8617  315 -8618 0
 8615 -8616  8617  315 -8619 0
 8615 -8616  8617  315  8620 0

c  1-1 --> 0
c    (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0 ∧ -p_315) -> (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧ -b^{5, 64}_0)
c  in CNF:
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_2
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_1
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_0
c  in DIMACS:
 8615  8616 -8617  315 -8618 0
 8615  8616 -8617  315 -8619 0
 8615  8616 -8617  315 -8620 0

c  0-1 --> -1
c    (-b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧ -p_315) -> ( b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0)
c  in CNF:
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨  b^{5, 64}_2
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_1
c     b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨  b^{5, 64}_0
c  in DIMACS:
 8615  8616  8617  315  8618 0
 8615  8616  8617  315 -8619 0
 8615  8616  8617  315  8620 0

c  -1-1 --> -2
c    ( b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧  b^{5, 63}_0 ∧ -p_315) -> ( b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0)
c  in CNF:
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨  b^{5, 64}_2
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨  b^{5, 64}_1
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨  p_315 ∨ -b^{5, 64}_0
c  in DIMACS:
-8615  8616 -8617  315  8618 0
-8615  8616 -8617  315  8619 0
-8615  8616 -8617  315 -8620 0

c  -2-1 --> break 
c    ( b^{5, 63}_2 ∧  b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨  b^{5, 63}_0 ∨  p_315 ∨ break
c  in DIMACS:
-8615 -8616  8617  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 63}_2 ∧ -b^{5, 63}_1 ∧ -b^{5, 63}_0 ∧ true) 
c  in CNF:
c    -b^{5, 63}_2 ∨  b^{5, 63}_1 ∨  b^{5, 63}_0 ∨ false 
c  in DIMACS:
-8615  8616  8617  0

c  3 does not represent an automaton state.
c    -(-b^{5, 63}_2 ∧  b^{5, 63}_1 ∧  b^{5, 63}_0 ∧ true) 
c  in CNF:
c     b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ false 
c  in DIMACS:
 8615 -8616 -8617  0
c  -3 does not represent an automaton state.
c    -( b^{5, 63}_2 ∧  b^{5, 63}_1 ∧  b^{5, 63}_0 ∧ true) 
c  in CNF:
c    -b^{5, 63}_2 ∨ -b^{5, 63}_1 ∨ -b^{5, 63}_0 ∨ false 
c  in DIMACS:
-8615 -8616 -8617  0

c i = 64
c  -2+1 --> -1
c    ( b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧  p_320) -> ( b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0)
c  in CNF:
c    -b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨  b^{5, 65}_2
c    -b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_1
c    -b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨  b^{5, 65}_0
c  in DIMACS:
-8618 -8619  8620 -320  8621 0
-8618 -8619  8620 -320 -8622 0
-8618 -8619  8620 -320  8623 0

c  -1+1 --> 0
c    ( b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0 ∧  p_320) -> (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧ -b^{5, 65}_0)
c  in CNF:
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_2
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_1
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_0
c  in DIMACS:
-8618  8619 -8620 -320 -8621 0
-8618  8619 -8620 -320 -8622 0
-8618  8619 -8620 -320 -8623 0

c  0+1 --> 1
c    (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧  p_320) -> (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0)
c  in CNF:
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_2
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_1
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨  b^{5, 65}_0
c  in DIMACS:
 8618  8619  8620 -320 -8621 0
 8618  8619  8620 -320 -8622 0
 8618  8619  8620 -320  8623 0

c  1+1 --> 2
c    (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0 ∧  p_320) -> (-b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0)
c  in CNF:
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_2
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨  b^{5, 65}_1
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ -p_320 ∨ -b^{5, 65}_0
c  in DIMACS:
 8618  8619 -8620 -320 -8621 0
 8618  8619 -8620 -320  8622 0
 8618  8619 -8620 -320 -8623 0

c  2+1 --> break 
c    (-b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧  p_320) -> break
c  in CNF:
c     b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 8618 -8619  8620 -320 1162 0


c  2-1 --> 1
c    (-b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧ -p_320) -> (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0)
c  in CNF:
c     b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_2
c     b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_1
c     b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨  b^{5, 65}_0
c  in DIMACS:
 8618 -8619  8620  320 -8621 0
 8618 -8619  8620  320 -8622 0
 8618 -8619  8620  320  8623 0

c  1-1 --> 0
c    (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0 ∧ -p_320) -> (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧ -b^{5, 65}_0)
c  in CNF:
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_2
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_1
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_0
c  in DIMACS:
 8618  8619 -8620  320 -8621 0
 8618  8619 -8620  320 -8622 0
 8618  8619 -8620  320 -8623 0

c  0-1 --> -1
c    (-b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧ -p_320) -> ( b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0)
c  in CNF:
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨  b^{5, 65}_2
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_1
c     b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨  b^{5, 65}_0
c  in DIMACS:
 8618  8619  8620  320  8621 0
 8618  8619  8620  320 -8622 0
 8618  8619  8620  320  8623 0

c  -1-1 --> -2
c    ( b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧  b^{5, 64}_0 ∧ -p_320) -> ( b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0)
c  in CNF:
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨  b^{5, 65}_2
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨  b^{5, 65}_1
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨  p_320 ∨ -b^{5, 65}_0
c  in DIMACS:
-8618  8619 -8620  320  8621 0
-8618  8619 -8620  320  8622 0
-8618  8619 -8620  320 -8623 0

c  -2-1 --> break 
c    ( b^{5, 64}_2 ∧  b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨  b^{5, 64}_0 ∨  p_320 ∨ break
c  in DIMACS:
-8618 -8619  8620  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 64}_2 ∧ -b^{5, 64}_1 ∧ -b^{5, 64}_0 ∧ true) 
c  in CNF:
c    -b^{5, 64}_2 ∨  b^{5, 64}_1 ∨  b^{5, 64}_0 ∨ false 
c  in DIMACS:
-8618  8619  8620  0

c  3 does not represent an automaton state.
c    -(-b^{5, 64}_2 ∧  b^{5, 64}_1 ∧  b^{5, 64}_0 ∧ true) 
c  in CNF:
c     b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ false 
c  in DIMACS:
 8618 -8619 -8620  0
c  -3 does not represent an automaton state.
c    -( b^{5, 64}_2 ∧  b^{5, 64}_1 ∧  b^{5, 64}_0 ∧ true) 
c  in CNF:
c    -b^{5, 64}_2 ∨ -b^{5, 64}_1 ∨ -b^{5, 64}_0 ∨ false 
c  in DIMACS:
-8618 -8619 -8620  0

c i = 65
c  -2+1 --> -1
c    ( b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧  p_325) -> ( b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0)
c  in CNF:
c    -b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨  b^{5, 66}_2
c    -b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_1
c    -b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨  b^{5, 66}_0
c  in DIMACS:
-8621 -8622  8623 -325  8624 0
-8621 -8622  8623 -325 -8625 0
-8621 -8622  8623 -325  8626 0

c  -1+1 --> 0
c    ( b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0 ∧  p_325) -> (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧ -b^{5, 66}_0)
c  in CNF:
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_2
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_1
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_0
c  in DIMACS:
-8621  8622 -8623 -325 -8624 0
-8621  8622 -8623 -325 -8625 0
-8621  8622 -8623 -325 -8626 0

c  0+1 --> 1
c    (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧  p_325) -> (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0)
c  in CNF:
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_2
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_1
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨  b^{5, 66}_0
c  in DIMACS:
 8621  8622  8623 -325 -8624 0
 8621  8622  8623 -325 -8625 0
 8621  8622  8623 -325  8626 0

c  1+1 --> 2
c    (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0 ∧  p_325) -> (-b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0)
c  in CNF:
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_2
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨  b^{5, 66}_1
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ -p_325 ∨ -b^{5, 66}_0
c  in DIMACS:
 8621  8622 -8623 -325 -8624 0
 8621  8622 -8623 -325  8625 0
 8621  8622 -8623 -325 -8626 0

c  2+1 --> break 
c    (-b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧  p_325) -> break
c  in CNF:
c     b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 8621 -8622  8623 -325 1162 0


c  2-1 --> 1
c    (-b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧ -p_325) -> (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0)
c  in CNF:
c     b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_2
c     b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_1
c     b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨  b^{5, 66}_0
c  in DIMACS:
 8621 -8622  8623  325 -8624 0
 8621 -8622  8623  325 -8625 0
 8621 -8622  8623  325  8626 0

c  1-1 --> 0
c    (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0 ∧ -p_325) -> (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧ -b^{5, 66}_0)
c  in CNF:
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_2
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_1
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_0
c  in DIMACS:
 8621  8622 -8623  325 -8624 0
 8621  8622 -8623  325 -8625 0
 8621  8622 -8623  325 -8626 0

c  0-1 --> -1
c    (-b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧ -p_325) -> ( b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0)
c  in CNF:
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨  b^{5, 66}_2
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_1
c     b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨  b^{5, 66}_0
c  in DIMACS:
 8621  8622  8623  325  8624 0
 8621  8622  8623  325 -8625 0
 8621  8622  8623  325  8626 0

c  -1-1 --> -2
c    ( b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧  b^{5, 65}_0 ∧ -p_325) -> ( b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0)
c  in CNF:
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨  b^{5, 66}_2
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨  b^{5, 66}_1
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨  p_325 ∨ -b^{5, 66}_0
c  in DIMACS:
-8621  8622 -8623  325  8624 0
-8621  8622 -8623  325  8625 0
-8621  8622 -8623  325 -8626 0

c  -2-1 --> break 
c    ( b^{5, 65}_2 ∧  b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨  b^{5, 65}_0 ∨  p_325 ∨ break
c  in DIMACS:
-8621 -8622  8623  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 65}_2 ∧ -b^{5, 65}_1 ∧ -b^{5, 65}_0 ∧ true) 
c  in CNF:
c    -b^{5, 65}_2 ∨  b^{5, 65}_1 ∨  b^{5, 65}_0 ∨ false 
c  in DIMACS:
-8621  8622  8623  0

c  3 does not represent an automaton state.
c    -(-b^{5, 65}_2 ∧  b^{5, 65}_1 ∧  b^{5, 65}_0 ∧ true) 
c  in CNF:
c     b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ false 
c  in DIMACS:
 8621 -8622 -8623  0
c  -3 does not represent an automaton state.
c    -( b^{5, 65}_2 ∧  b^{5, 65}_1 ∧  b^{5, 65}_0 ∧ true) 
c  in CNF:
c    -b^{5, 65}_2 ∨ -b^{5, 65}_1 ∨ -b^{5, 65}_0 ∨ false 
c  in DIMACS:
-8621 -8622 -8623  0

c i = 66
c  -2+1 --> -1
c    ( b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧  p_330) -> ( b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0)
c  in CNF:
c    -b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨  b^{5, 67}_2
c    -b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_1
c    -b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨  b^{5, 67}_0
c  in DIMACS:
-8624 -8625  8626 -330  8627 0
-8624 -8625  8626 -330 -8628 0
-8624 -8625  8626 -330  8629 0

c  -1+1 --> 0
c    ( b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0 ∧  p_330) -> (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧ -b^{5, 67}_0)
c  in CNF:
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_2
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_1
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_0
c  in DIMACS:
-8624  8625 -8626 -330 -8627 0
-8624  8625 -8626 -330 -8628 0
-8624  8625 -8626 -330 -8629 0

c  0+1 --> 1
c    (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧  p_330) -> (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0)
c  in CNF:
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_2
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_1
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨  b^{5, 67}_0
c  in DIMACS:
 8624  8625  8626 -330 -8627 0
 8624  8625  8626 -330 -8628 0
 8624  8625  8626 -330  8629 0

c  1+1 --> 2
c    (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0 ∧  p_330) -> (-b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0)
c  in CNF:
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_2
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨  b^{5, 67}_1
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ -p_330 ∨ -b^{5, 67}_0
c  in DIMACS:
 8624  8625 -8626 -330 -8627 0
 8624  8625 -8626 -330  8628 0
 8624  8625 -8626 -330 -8629 0

c  2+1 --> break 
c    (-b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧  p_330) -> break
c  in CNF:
c     b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 8624 -8625  8626 -330 1162 0


c  2-1 --> 1
c    (-b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧ -p_330) -> (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0)
c  in CNF:
c     b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_2
c     b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_1
c     b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨  b^{5, 67}_0
c  in DIMACS:
 8624 -8625  8626  330 -8627 0
 8624 -8625  8626  330 -8628 0
 8624 -8625  8626  330  8629 0

c  1-1 --> 0
c    (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0 ∧ -p_330) -> (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧ -b^{5, 67}_0)
c  in CNF:
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_2
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_1
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_0
c  in DIMACS:
 8624  8625 -8626  330 -8627 0
 8624  8625 -8626  330 -8628 0
 8624  8625 -8626  330 -8629 0

c  0-1 --> -1
c    (-b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧ -p_330) -> ( b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0)
c  in CNF:
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨  b^{5, 67}_2
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_1
c     b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨  b^{5, 67}_0
c  in DIMACS:
 8624  8625  8626  330  8627 0
 8624  8625  8626  330 -8628 0
 8624  8625  8626  330  8629 0

c  -1-1 --> -2
c    ( b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧  b^{5, 66}_0 ∧ -p_330) -> ( b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0)
c  in CNF:
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨  b^{5, 67}_2
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨  b^{5, 67}_1
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨  p_330 ∨ -b^{5, 67}_0
c  in DIMACS:
-8624  8625 -8626  330  8627 0
-8624  8625 -8626  330  8628 0
-8624  8625 -8626  330 -8629 0

c  -2-1 --> break 
c    ( b^{5, 66}_2 ∧  b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨  b^{5, 66}_0 ∨  p_330 ∨ break
c  in DIMACS:
-8624 -8625  8626  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 66}_2 ∧ -b^{5, 66}_1 ∧ -b^{5, 66}_0 ∧ true) 
c  in CNF:
c    -b^{5, 66}_2 ∨  b^{5, 66}_1 ∨  b^{5, 66}_0 ∨ false 
c  in DIMACS:
-8624  8625  8626  0

c  3 does not represent an automaton state.
c    -(-b^{5, 66}_2 ∧  b^{5, 66}_1 ∧  b^{5, 66}_0 ∧ true) 
c  in CNF:
c     b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ false 
c  in DIMACS:
 8624 -8625 -8626  0
c  -3 does not represent an automaton state.
c    -( b^{5, 66}_2 ∧  b^{5, 66}_1 ∧  b^{5, 66}_0 ∧ true) 
c  in CNF:
c    -b^{5, 66}_2 ∨ -b^{5, 66}_1 ∨ -b^{5, 66}_0 ∨ false 
c  in DIMACS:
-8624 -8625 -8626  0

c i = 67
c  -2+1 --> -1
c    ( b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧  p_335) -> ( b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0)
c  in CNF:
c    -b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨  b^{5, 68}_2
c    -b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_1
c    -b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨  b^{5, 68}_0
c  in DIMACS:
-8627 -8628  8629 -335  8630 0
-8627 -8628  8629 -335 -8631 0
-8627 -8628  8629 -335  8632 0

c  -1+1 --> 0
c    ( b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0 ∧  p_335) -> (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧ -b^{5, 68}_0)
c  in CNF:
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_2
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_1
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_0
c  in DIMACS:
-8627  8628 -8629 -335 -8630 0
-8627  8628 -8629 -335 -8631 0
-8627  8628 -8629 -335 -8632 0

c  0+1 --> 1
c    (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧  p_335) -> (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0)
c  in CNF:
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_2
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_1
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨  b^{5, 68}_0
c  in DIMACS:
 8627  8628  8629 -335 -8630 0
 8627  8628  8629 -335 -8631 0
 8627  8628  8629 -335  8632 0

c  1+1 --> 2
c    (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0 ∧  p_335) -> (-b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0)
c  in CNF:
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_2
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨  b^{5, 68}_1
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ -p_335 ∨ -b^{5, 68}_0
c  in DIMACS:
 8627  8628 -8629 -335 -8630 0
 8627  8628 -8629 -335  8631 0
 8627  8628 -8629 -335 -8632 0

c  2+1 --> break 
c    (-b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧  p_335) -> break
c  in CNF:
c     b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ -p_335 ∨ break
c  in DIMACS:
 8627 -8628  8629 -335 1162 0


c  2-1 --> 1
c    (-b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧ -p_335) -> (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0)
c  in CNF:
c     b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_2
c     b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_1
c     b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨  b^{5, 68}_0
c  in DIMACS:
 8627 -8628  8629  335 -8630 0
 8627 -8628  8629  335 -8631 0
 8627 -8628  8629  335  8632 0

c  1-1 --> 0
c    (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0 ∧ -p_335) -> (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧ -b^{5, 68}_0)
c  in CNF:
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_2
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_1
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_0
c  in DIMACS:
 8627  8628 -8629  335 -8630 0
 8627  8628 -8629  335 -8631 0
 8627  8628 -8629  335 -8632 0

c  0-1 --> -1
c    (-b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧ -p_335) -> ( b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0)
c  in CNF:
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨  b^{5, 68}_2
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_1
c     b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨  b^{5, 68}_0
c  in DIMACS:
 8627  8628  8629  335  8630 0
 8627  8628  8629  335 -8631 0
 8627  8628  8629  335  8632 0

c  -1-1 --> -2
c    ( b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧  b^{5, 67}_0 ∧ -p_335) -> ( b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0)
c  in CNF:
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨  b^{5, 68}_2
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨  b^{5, 68}_1
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨  p_335 ∨ -b^{5, 68}_0
c  in DIMACS:
-8627  8628 -8629  335  8630 0
-8627  8628 -8629  335  8631 0
-8627  8628 -8629  335 -8632 0

c  -2-1 --> break 
c    ( b^{5, 67}_2 ∧  b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧ -p_335) -> break
c  in CNF:
c    -b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨  b^{5, 67}_0 ∨  p_335 ∨ break
c  in DIMACS:
-8627 -8628  8629  335 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 67}_2 ∧ -b^{5, 67}_1 ∧ -b^{5, 67}_0 ∧ true) 
c  in CNF:
c    -b^{5, 67}_2 ∨  b^{5, 67}_1 ∨  b^{5, 67}_0 ∨ false 
c  in DIMACS:
-8627  8628  8629  0

c  3 does not represent an automaton state.
c    -(-b^{5, 67}_2 ∧  b^{5, 67}_1 ∧  b^{5, 67}_0 ∧ true) 
c  in CNF:
c     b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ false 
c  in DIMACS:
 8627 -8628 -8629  0
c  -3 does not represent an automaton state.
c    -( b^{5, 67}_2 ∧  b^{5, 67}_1 ∧  b^{5, 67}_0 ∧ true) 
c  in CNF:
c    -b^{5, 67}_2 ∨ -b^{5, 67}_1 ∨ -b^{5, 67}_0 ∨ false 
c  in DIMACS:
-8627 -8628 -8629  0

c i = 68
c  -2+1 --> -1
c    ( b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧  p_340) -> ( b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0)
c  in CNF:
c    -b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨  b^{5, 69}_2
c    -b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_1
c    -b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨  b^{5, 69}_0
c  in DIMACS:
-8630 -8631  8632 -340  8633 0
-8630 -8631  8632 -340 -8634 0
-8630 -8631  8632 -340  8635 0

c  -1+1 --> 0
c    ( b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0 ∧  p_340) -> (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧ -b^{5, 69}_0)
c  in CNF:
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_2
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_1
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_0
c  in DIMACS:
-8630  8631 -8632 -340 -8633 0
-8630  8631 -8632 -340 -8634 0
-8630  8631 -8632 -340 -8635 0

c  0+1 --> 1
c    (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧  p_340) -> (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0)
c  in CNF:
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_2
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_1
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨  b^{5, 69}_0
c  in DIMACS:
 8630  8631  8632 -340 -8633 0
 8630  8631  8632 -340 -8634 0
 8630  8631  8632 -340  8635 0

c  1+1 --> 2
c    (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0 ∧  p_340) -> (-b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0)
c  in CNF:
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_2
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨  b^{5, 69}_1
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ -p_340 ∨ -b^{5, 69}_0
c  in DIMACS:
 8630  8631 -8632 -340 -8633 0
 8630  8631 -8632 -340  8634 0
 8630  8631 -8632 -340 -8635 0

c  2+1 --> break 
c    (-b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧  p_340) -> break
c  in CNF:
c     b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 8630 -8631  8632 -340 1162 0


c  2-1 --> 1
c    (-b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧ -p_340) -> (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0)
c  in CNF:
c     b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_2
c     b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_1
c     b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨  b^{5, 69}_0
c  in DIMACS:
 8630 -8631  8632  340 -8633 0
 8630 -8631  8632  340 -8634 0
 8630 -8631  8632  340  8635 0

c  1-1 --> 0
c    (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0 ∧ -p_340) -> (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧ -b^{5, 69}_0)
c  in CNF:
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_2
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_1
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_0
c  in DIMACS:
 8630  8631 -8632  340 -8633 0
 8630  8631 -8632  340 -8634 0
 8630  8631 -8632  340 -8635 0

c  0-1 --> -1
c    (-b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧ -p_340) -> ( b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0)
c  in CNF:
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨  b^{5, 69}_2
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_1
c     b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨  b^{5, 69}_0
c  in DIMACS:
 8630  8631  8632  340  8633 0
 8630  8631  8632  340 -8634 0
 8630  8631  8632  340  8635 0

c  -1-1 --> -2
c    ( b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧  b^{5, 68}_0 ∧ -p_340) -> ( b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0)
c  in CNF:
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨  b^{5, 69}_2
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨  b^{5, 69}_1
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨  p_340 ∨ -b^{5, 69}_0
c  in DIMACS:
-8630  8631 -8632  340  8633 0
-8630  8631 -8632  340  8634 0
-8630  8631 -8632  340 -8635 0

c  -2-1 --> break 
c    ( b^{5, 68}_2 ∧  b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨  b^{5, 68}_0 ∨  p_340 ∨ break
c  in DIMACS:
-8630 -8631  8632  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 68}_2 ∧ -b^{5, 68}_1 ∧ -b^{5, 68}_0 ∧ true) 
c  in CNF:
c    -b^{5, 68}_2 ∨  b^{5, 68}_1 ∨  b^{5, 68}_0 ∨ false 
c  in DIMACS:
-8630  8631  8632  0

c  3 does not represent an automaton state.
c    -(-b^{5, 68}_2 ∧  b^{5, 68}_1 ∧  b^{5, 68}_0 ∧ true) 
c  in CNF:
c     b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ false 
c  in DIMACS:
 8630 -8631 -8632  0
c  -3 does not represent an automaton state.
c    -( b^{5, 68}_2 ∧  b^{5, 68}_1 ∧  b^{5, 68}_0 ∧ true) 
c  in CNF:
c    -b^{5, 68}_2 ∨ -b^{5, 68}_1 ∨ -b^{5, 68}_0 ∨ false 
c  in DIMACS:
-8630 -8631 -8632  0

c i = 69
c  -2+1 --> -1
c    ( b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧  p_345) -> ( b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0)
c  in CNF:
c    -b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨  b^{5, 70}_2
c    -b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_1
c    -b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨  b^{5, 70}_0
c  in DIMACS:
-8633 -8634  8635 -345  8636 0
-8633 -8634  8635 -345 -8637 0
-8633 -8634  8635 -345  8638 0

c  -1+1 --> 0
c    ( b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0 ∧  p_345) -> (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧ -b^{5, 70}_0)
c  in CNF:
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_2
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_1
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_0
c  in DIMACS:
-8633  8634 -8635 -345 -8636 0
-8633  8634 -8635 -345 -8637 0
-8633  8634 -8635 -345 -8638 0

c  0+1 --> 1
c    (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧  p_345) -> (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0)
c  in CNF:
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_2
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_1
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨  b^{5, 70}_0
c  in DIMACS:
 8633  8634  8635 -345 -8636 0
 8633  8634  8635 -345 -8637 0
 8633  8634  8635 -345  8638 0

c  1+1 --> 2
c    (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0 ∧  p_345) -> (-b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0)
c  in CNF:
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_2
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨  b^{5, 70}_1
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ -p_345 ∨ -b^{5, 70}_0
c  in DIMACS:
 8633  8634 -8635 -345 -8636 0
 8633  8634 -8635 -345  8637 0
 8633  8634 -8635 -345 -8638 0

c  2+1 --> break 
c    (-b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧  p_345) -> break
c  in CNF:
c     b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 8633 -8634  8635 -345 1162 0


c  2-1 --> 1
c    (-b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧ -p_345) -> (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0)
c  in CNF:
c     b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_2
c     b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_1
c     b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨  b^{5, 70}_0
c  in DIMACS:
 8633 -8634  8635  345 -8636 0
 8633 -8634  8635  345 -8637 0
 8633 -8634  8635  345  8638 0

c  1-1 --> 0
c    (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0 ∧ -p_345) -> (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧ -b^{5, 70}_0)
c  in CNF:
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_2
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_1
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_0
c  in DIMACS:
 8633  8634 -8635  345 -8636 0
 8633  8634 -8635  345 -8637 0
 8633  8634 -8635  345 -8638 0

c  0-1 --> -1
c    (-b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧ -p_345) -> ( b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0)
c  in CNF:
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨  b^{5, 70}_2
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_1
c     b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨  b^{5, 70}_0
c  in DIMACS:
 8633  8634  8635  345  8636 0
 8633  8634  8635  345 -8637 0
 8633  8634  8635  345  8638 0

c  -1-1 --> -2
c    ( b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧  b^{5, 69}_0 ∧ -p_345) -> ( b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0)
c  in CNF:
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨  b^{5, 70}_2
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨  b^{5, 70}_1
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨  p_345 ∨ -b^{5, 70}_0
c  in DIMACS:
-8633  8634 -8635  345  8636 0
-8633  8634 -8635  345  8637 0
-8633  8634 -8635  345 -8638 0

c  -2-1 --> break 
c    ( b^{5, 69}_2 ∧  b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨  b^{5, 69}_0 ∨  p_345 ∨ break
c  in DIMACS:
-8633 -8634  8635  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 69}_2 ∧ -b^{5, 69}_1 ∧ -b^{5, 69}_0 ∧ true) 
c  in CNF:
c    -b^{5, 69}_2 ∨  b^{5, 69}_1 ∨  b^{5, 69}_0 ∨ false 
c  in DIMACS:
-8633  8634  8635  0

c  3 does not represent an automaton state.
c    -(-b^{5, 69}_2 ∧  b^{5, 69}_1 ∧  b^{5, 69}_0 ∧ true) 
c  in CNF:
c     b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ false 
c  in DIMACS:
 8633 -8634 -8635  0
c  -3 does not represent an automaton state.
c    -( b^{5, 69}_2 ∧  b^{5, 69}_1 ∧  b^{5, 69}_0 ∧ true) 
c  in CNF:
c    -b^{5, 69}_2 ∨ -b^{5, 69}_1 ∨ -b^{5, 69}_0 ∨ false 
c  in DIMACS:
-8633 -8634 -8635  0

c i = 70
c  -2+1 --> -1
c    ( b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧  p_350) -> ( b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0)
c  in CNF:
c    -b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨  b^{5, 71}_2
c    -b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_1
c    -b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨  b^{5, 71}_0
c  in DIMACS:
-8636 -8637  8638 -350  8639 0
-8636 -8637  8638 -350 -8640 0
-8636 -8637  8638 -350  8641 0

c  -1+1 --> 0
c    ( b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0 ∧  p_350) -> (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧ -b^{5, 71}_0)
c  in CNF:
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_2
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_1
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_0
c  in DIMACS:
-8636  8637 -8638 -350 -8639 0
-8636  8637 -8638 -350 -8640 0
-8636  8637 -8638 -350 -8641 0

c  0+1 --> 1
c    (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧  p_350) -> (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0)
c  in CNF:
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_2
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_1
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨  b^{5, 71}_0
c  in DIMACS:
 8636  8637  8638 -350 -8639 0
 8636  8637  8638 -350 -8640 0
 8636  8637  8638 -350  8641 0

c  1+1 --> 2
c    (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0 ∧  p_350) -> (-b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0)
c  in CNF:
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_2
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨  b^{5, 71}_1
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ -p_350 ∨ -b^{5, 71}_0
c  in DIMACS:
 8636  8637 -8638 -350 -8639 0
 8636  8637 -8638 -350  8640 0
 8636  8637 -8638 -350 -8641 0

c  2+1 --> break 
c    (-b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧  p_350) -> break
c  in CNF:
c     b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 8636 -8637  8638 -350 1162 0


c  2-1 --> 1
c    (-b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧ -p_350) -> (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0)
c  in CNF:
c     b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_2
c     b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_1
c     b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨  b^{5, 71}_0
c  in DIMACS:
 8636 -8637  8638  350 -8639 0
 8636 -8637  8638  350 -8640 0
 8636 -8637  8638  350  8641 0

c  1-1 --> 0
c    (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0 ∧ -p_350) -> (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧ -b^{5, 71}_0)
c  in CNF:
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_2
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_1
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_0
c  in DIMACS:
 8636  8637 -8638  350 -8639 0
 8636  8637 -8638  350 -8640 0
 8636  8637 -8638  350 -8641 0

c  0-1 --> -1
c    (-b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧ -p_350) -> ( b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0)
c  in CNF:
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨  b^{5, 71}_2
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_1
c     b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨  b^{5, 71}_0
c  in DIMACS:
 8636  8637  8638  350  8639 0
 8636  8637  8638  350 -8640 0
 8636  8637  8638  350  8641 0

c  -1-1 --> -2
c    ( b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧  b^{5, 70}_0 ∧ -p_350) -> ( b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0)
c  in CNF:
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨  b^{5, 71}_2
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨  b^{5, 71}_1
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨  p_350 ∨ -b^{5, 71}_0
c  in DIMACS:
-8636  8637 -8638  350  8639 0
-8636  8637 -8638  350  8640 0
-8636  8637 -8638  350 -8641 0

c  -2-1 --> break 
c    ( b^{5, 70}_2 ∧  b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨  b^{5, 70}_0 ∨  p_350 ∨ break
c  in DIMACS:
-8636 -8637  8638  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 70}_2 ∧ -b^{5, 70}_1 ∧ -b^{5, 70}_0 ∧ true) 
c  in CNF:
c    -b^{5, 70}_2 ∨  b^{5, 70}_1 ∨  b^{5, 70}_0 ∨ false 
c  in DIMACS:
-8636  8637  8638  0

c  3 does not represent an automaton state.
c    -(-b^{5, 70}_2 ∧  b^{5, 70}_1 ∧  b^{5, 70}_0 ∧ true) 
c  in CNF:
c     b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ false 
c  in DIMACS:
 8636 -8637 -8638  0
c  -3 does not represent an automaton state.
c    -( b^{5, 70}_2 ∧  b^{5, 70}_1 ∧  b^{5, 70}_0 ∧ true) 
c  in CNF:
c    -b^{5, 70}_2 ∨ -b^{5, 70}_1 ∨ -b^{5, 70}_0 ∨ false 
c  in DIMACS:
-8636 -8637 -8638  0

c i = 71
c  -2+1 --> -1
c    ( b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧  p_355) -> ( b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0)
c  in CNF:
c    -b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨  b^{5, 72}_2
c    -b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_1
c    -b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨  b^{5, 72}_0
c  in DIMACS:
-8639 -8640  8641 -355  8642 0
-8639 -8640  8641 -355 -8643 0
-8639 -8640  8641 -355  8644 0

c  -1+1 --> 0
c    ( b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0 ∧  p_355) -> (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧ -b^{5, 72}_0)
c  in CNF:
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_2
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_1
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_0
c  in DIMACS:
-8639  8640 -8641 -355 -8642 0
-8639  8640 -8641 -355 -8643 0
-8639  8640 -8641 -355 -8644 0

c  0+1 --> 1
c    (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧  p_355) -> (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0)
c  in CNF:
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_2
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_1
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨  b^{5, 72}_0
c  in DIMACS:
 8639  8640  8641 -355 -8642 0
 8639  8640  8641 -355 -8643 0
 8639  8640  8641 -355  8644 0

c  1+1 --> 2
c    (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0 ∧  p_355) -> (-b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0)
c  in CNF:
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_2
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨  b^{5, 72}_1
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ -p_355 ∨ -b^{5, 72}_0
c  in DIMACS:
 8639  8640 -8641 -355 -8642 0
 8639  8640 -8641 -355  8643 0
 8639  8640 -8641 -355 -8644 0

c  2+1 --> break 
c    (-b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧  p_355) -> break
c  in CNF:
c     b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ -p_355 ∨ break
c  in DIMACS:
 8639 -8640  8641 -355 1162 0


c  2-1 --> 1
c    (-b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧ -p_355) -> (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0)
c  in CNF:
c     b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_2
c     b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_1
c     b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨  b^{5, 72}_0
c  in DIMACS:
 8639 -8640  8641  355 -8642 0
 8639 -8640  8641  355 -8643 0
 8639 -8640  8641  355  8644 0

c  1-1 --> 0
c    (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0 ∧ -p_355) -> (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧ -b^{5, 72}_0)
c  in CNF:
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_2
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_1
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_0
c  in DIMACS:
 8639  8640 -8641  355 -8642 0
 8639  8640 -8641  355 -8643 0
 8639  8640 -8641  355 -8644 0

c  0-1 --> -1
c    (-b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧ -p_355) -> ( b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0)
c  in CNF:
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨  b^{5, 72}_2
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_1
c     b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨  b^{5, 72}_0
c  in DIMACS:
 8639  8640  8641  355  8642 0
 8639  8640  8641  355 -8643 0
 8639  8640  8641  355  8644 0

c  -1-1 --> -2
c    ( b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧  b^{5, 71}_0 ∧ -p_355) -> ( b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0)
c  in CNF:
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨  b^{5, 72}_2
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨  b^{5, 72}_1
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨  p_355 ∨ -b^{5, 72}_0
c  in DIMACS:
-8639  8640 -8641  355  8642 0
-8639  8640 -8641  355  8643 0
-8639  8640 -8641  355 -8644 0

c  -2-1 --> break 
c    ( b^{5, 71}_2 ∧  b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧ -p_355) -> break
c  in CNF:
c    -b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨  b^{5, 71}_0 ∨  p_355 ∨ break
c  in DIMACS:
-8639 -8640  8641  355 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 71}_2 ∧ -b^{5, 71}_1 ∧ -b^{5, 71}_0 ∧ true) 
c  in CNF:
c    -b^{5, 71}_2 ∨  b^{5, 71}_1 ∨  b^{5, 71}_0 ∨ false 
c  in DIMACS:
-8639  8640  8641  0

c  3 does not represent an automaton state.
c    -(-b^{5, 71}_2 ∧  b^{5, 71}_1 ∧  b^{5, 71}_0 ∧ true) 
c  in CNF:
c     b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ false 
c  in DIMACS:
 8639 -8640 -8641  0
c  -3 does not represent an automaton state.
c    -( b^{5, 71}_2 ∧  b^{5, 71}_1 ∧  b^{5, 71}_0 ∧ true) 
c  in CNF:
c    -b^{5, 71}_2 ∨ -b^{5, 71}_1 ∨ -b^{5, 71}_0 ∨ false 
c  in DIMACS:
-8639 -8640 -8641  0

c i = 72
c  -2+1 --> -1
c    ( b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧  p_360) -> ( b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0)
c  in CNF:
c    -b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨  b^{5, 73}_2
c    -b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_1
c    -b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨  b^{5, 73}_0
c  in DIMACS:
-8642 -8643  8644 -360  8645 0
-8642 -8643  8644 -360 -8646 0
-8642 -8643  8644 -360  8647 0

c  -1+1 --> 0
c    ( b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0 ∧  p_360) -> (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧ -b^{5, 73}_0)
c  in CNF:
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_2
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_1
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_0
c  in DIMACS:
-8642  8643 -8644 -360 -8645 0
-8642  8643 -8644 -360 -8646 0
-8642  8643 -8644 -360 -8647 0

c  0+1 --> 1
c    (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧  p_360) -> (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0)
c  in CNF:
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_2
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_1
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨  b^{5, 73}_0
c  in DIMACS:
 8642  8643  8644 -360 -8645 0
 8642  8643  8644 -360 -8646 0
 8642  8643  8644 -360  8647 0

c  1+1 --> 2
c    (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0 ∧  p_360) -> (-b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0)
c  in CNF:
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_2
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨  b^{5, 73}_1
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ -p_360 ∨ -b^{5, 73}_0
c  in DIMACS:
 8642  8643 -8644 -360 -8645 0
 8642  8643 -8644 -360  8646 0
 8642  8643 -8644 -360 -8647 0

c  2+1 --> break 
c    (-b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧  p_360) -> break
c  in CNF:
c     b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 8642 -8643  8644 -360 1162 0


c  2-1 --> 1
c    (-b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧ -p_360) -> (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0)
c  in CNF:
c     b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_2
c     b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_1
c     b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨  b^{5, 73}_0
c  in DIMACS:
 8642 -8643  8644  360 -8645 0
 8642 -8643  8644  360 -8646 0
 8642 -8643  8644  360  8647 0

c  1-1 --> 0
c    (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0 ∧ -p_360) -> (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧ -b^{5, 73}_0)
c  in CNF:
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_2
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_1
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_0
c  in DIMACS:
 8642  8643 -8644  360 -8645 0
 8642  8643 -8644  360 -8646 0
 8642  8643 -8644  360 -8647 0

c  0-1 --> -1
c    (-b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧ -p_360) -> ( b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0)
c  in CNF:
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨  b^{5, 73}_2
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_1
c     b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨  b^{5, 73}_0
c  in DIMACS:
 8642  8643  8644  360  8645 0
 8642  8643  8644  360 -8646 0
 8642  8643  8644  360  8647 0

c  -1-1 --> -2
c    ( b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧  b^{5, 72}_0 ∧ -p_360) -> ( b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0)
c  in CNF:
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨  b^{5, 73}_2
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨  b^{5, 73}_1
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨  p_360 ∨ -b^{5, 73}_0
c  in DIMACS:
-8642  8643 -8644  360  8645 0
-8642  8643 -8644  360  8646 0
-8642  8643 -8644  360 -8647 0

c  -2-1 --> break 
c    ( b^{5, 72}_2 ∧  b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨  b^{5, 72}_0 ∨  p_360 ∨ break
c  in DIMACS:
-8642 -8643  8644  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 72}_2 ∧ -b^{5, 72}_1 ∧ -b^{5, 72}_0 ∧ true) 
c  in CNF:
c    -b^{5, 72}_2 ∨  b^{5, 72}_1 ∨  b^{5, 72}_0 ∨ false 
c  in DIMACS:
-8642  8643  8644  0

c  3 does not represent an automaton state.
c    -(-b^{5, 72}_2 ∧  b^{5, 72}_1 ∧  b^{5, 72}_0 ∧ true) 
c  in CNF:
c     b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ false 
c  in DIMACS:
 8642 -8643 -8644  0
c  -3 does not represent an automaton state.
c    -( b^{5, 72}_2 ∧  b^{5, 72}_1 ∧  b^{5, 72}_0 ∧ true) 
c  in CNF:
c    -b^{5, 72}_2 ∨ -b^{5, 72}_1 ∨ -b^{5, 72}_0 ∨ false 
c  in DIMACS:
-8642 -8643 -8644  0

c i = 73
c  -2+1 --> -1
c    ( b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧  p_365) -> ( b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0)
c  in CNF:
c    -b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨  b^{5, 74}_2
c    -b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_1
c    -b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨  b^{5, 74}_0
c  in DIMACS:
-8645 -8646  8647 -365  8648 0
-8645 -8646  8647 -365 -8649 0
-8645 -8646  8647 -365  8650 0

c  -1+1 --> 0
c    ( b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0 ∧  p_365) -> (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧ -b^{5, 74}_0)
c  in CNF:
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_2
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_1
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_0
c  in DIMACS:
-8645  8646 -8647 -365 -8648 0
-8645  8646 -8647 -365 -8649 0
-8645  8646 -8647 -365 -8650 0

c  0+1 --> 1
c    (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧  p_365) -> (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0)
c  in CNF:
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_2
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_1
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨  b^{5, 74}_0
c  in DIMACS:
 8645  8646  8647 -365 -8648 0
 8645  8646  8647 -365 -8649 0
 8645  8646  8647 -365  8650 0

c  1+1 --> 2
c    (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0 ∧  p_365) -> (-b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0)
c  in CNF:
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_2
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨  b^{5, 74}_1
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ -p_365 ∨ -b^{5, 74}_0
c  in DIMACS:
 8645  8646 -8647 -365 -8648 0
 8645  8646 -8647 -365  8649 0
 8645  8646 -8647 -365 -8650 0

c  2+1 --> break 
c    (-b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧  p_365) -> break
c  in CNF:
c     b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ -p_365 ∨ break
c  in DIMACS:
 8645 -8646  8647 -365 1162 0


c  2-1 --> 1
c    (-b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧ -p_365) -> (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0)
c  in CNF:
c     b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_2
c     b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_1
c     b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨  b^{5, 74}_0
c  in DIMACS:
 8645 -8646  8647  365 -8648 0
 8645 -8646  8647  365 -8649 0
 8645 -8646  8647  365  8650 0

c  1-1 --> 0
c    (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0 ∧ -p_365) -> (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧ -b^{5, 74}_0)
c  in CNF:
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_2
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_1
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_0
c  in DIMACS:
 8645  8646 -8647  365 -8648 0
 8645  8646 -8647  365 -8649 0
 8645  8646 -8647  365 -8650 0

c  0-1 --> -1
c    (-b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧ -p_365) -> ( b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0)
c  in CNF:
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨  b^{5, 74}_2
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_1
c     b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨  b^{5, 74}_0
c  in DIMACS:
 8645  8646  8647  365  8648 0
 8645  8646  8647  365 -8649 0
 8645  8646  8647  365  8650 0

c  -1-1 --> -2
c    ( b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧  b^{5, 73}_0 ∧ -p_365) -> ( b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0)
c  in CNF:
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨  b^{5, 74}_2
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨  b^{5, 74}_1
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨  p_365 ∨ -b^{5, 74}_0
c  in DIMACS:
-8645  8646 -8647  365  8648 0
-8645  8646 -8647  365  8649 0
-8645  8646 -8647  365 -8650 0

c  -2-1 --> break 
c    ( b^{5, 73}_2 ∧  b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧ -p_365) -> break
c  in CNF:
c    -b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨  b^{5, 73}_0 ∨  p_365 ∨ break
c  in DIMACS:
-8645 -8646  8647  365 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 73}_2 ∧ -b^{5, 73}_1 ∧ -b^{5, 73}_0 ∧ true) 
c  in CNF:
c    -b^{5, 73}_2 ∨  b^{5, 73}_1 ∨  b^{5, 73}_0 ∨ false 
c  in DIMACS:
-8645  8646  8647  0

c  3 does not represent an automaton state.
c    -(-b^{5, 73}_2 ∧  b^{5, 73}_1 ∧  b^{5, 73}_0 ∧ true) 
c  in CNF:
c     b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ false 
c  in DIMACS:
 8645 -8646 -8647  0
c  -3 does not represent an automaton state.
c    -( b^{5, 73}_2 ∧  b^{5, 73}_1 ∧  b^{5, 73}_0 ∧ true) 
c  in CNF:
c    -b^{5, 73}_2 ∨ -b^{5, 73}_1 ∨ -b^{5, 73}_0 ∨ false 
c  in DIMACS:
-8645 -8646 -8647  0

c i = 74
c  -2+1 --> -1
c    ( b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧  p_370) -> ( b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0)
c  in CNF:
c    -b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨  b^{5, 75}_2
c    -b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_1
c    -b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨  b^{5, 75}_0
c  in DIMACS:
-8648 -8649  8650 -370  8651 0
-8648 -8649  8650 -370 -8652 0
-8648 -8649  8650 -370  8653 0

c  -1+1 --> 0
c    ( b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0 ∧  p_370) -> (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧ -b^{5, 75}_0)
c  in CNF:
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_2
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_1
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_0
c  in DIMACS:
-8648  8649 -8650 -370 -8651 0
-8648  8649 -8650 -370 -8652 0
-8648  8649 -8650 -370 -8653 0

c  0+1 --> 1
c    (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧  p_370) -> (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0)
c  in CNF:
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_2
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_1
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨  b^{5, 75}_0
c  in DIMACS:
 8648  8649  8650 -370 -8651 0
 8648  8649  8650 -370 -8652 0
 8648  8649  8650 -370  8653 0

c  1+1 --> 2
c    (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0 ∧  p_370) -> (-b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0)
c  in CNF:
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_2
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨  b^{5, 75}_1
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ -p_370 ∨ -b^{5, 75}_0
c  in DIMACS:
 8648  8649 -8650 -370 -8651 0
 8648  8649 -8650 -370  8652 0
 8648  8649 -8650 -370 -8653 0

c  2+1 --> break 
c    (-b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧  p_370) -> break
c  in CNF:
c     b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 8648 -8649  8650 -370 1162 0


c  2-1 --> 1
c    (-b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧ -p_370) -> (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0)
c  in CNF:
c     b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_2
c     b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_1
c     b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨  b^{5, 75}_0
c  in DIMACS:
 8648 -8649  8650  370 -8651 0
 8648 -8649  8650  370 -8652 0
 8648 -8649  8650  370  8653 0

c  1-1 --> 0
c    (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0 ∧ -p_370) -> (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧ -b^{5, 75}_0)
c  in CNF:
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_2
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_1
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_0
c  in DIMACS:
 8648  8649 -8650  370 -8651 0
 8648  8649 -8650  370 -8652 0
 8648  8649 -8650  370 -8653 0

c  0-1 --> -1
c    (-b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧ -p_370) -> ( b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0)
c  in CNF:
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨  b^{5, 75}_2
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_1
c     b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨  b^{5, 75}_0
c  in DIMACS:
 8648  8649  8650  370  8651 0
 8648  8649  8650  370 -8652 0
 8648  8649  8650  370  8653 0

c  -1-1 --> -2
c    ( b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧  b^{5, 74}_0 ∧ -p_370) -> ( b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0)
c  in CNF:
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨  b^{5, 75}_2
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨  b^{5, 75}_1
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨  p_370 ∨ -b^{5, 75}_0
c  in DIMACS:
-8648  8649 -8650  370  8651 0
-8648  8649 -8650  370  8652 0
-8648  8649 -8650  370 -8653 0

c  -2-1 --> break 
c    ( b^{5, 74}_2 ∧  b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨  b^{5, 74}_0 ∨  p_370 ∨ break
c  in DIMACS:
-8648 -8649  8650  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 74}_2 ∧ -b^{5, 74}_1 ∧ -b^{5, 74}_0 ∧ true) 
c  in CNF:
c    -b^{5, 74}_2 ∨  b^{5, 74}_1 ∨  b^{5, 74}_0 ∨ false 
c  in DIMACS:
-8648  8649  8650  0

c  3 does not represent an automaton state.
c    -(-b^{5, 74}_2 ∧  b^{5, 74}_1 ∧  b^{5, 74}_0 ∧ true) 
c  in CNF:
c     b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ false 
c  in DIMACS:
 8648 -8649 -8650  0
c  -3 does not represent an automaton state.
c    -( b^{5, 74}_2 ∧  b^{5, 74}_1 ∧  b^{5, 74}_0 ∧ true) 
c  in CNF:
c    -b^{5, 74}_2 ∨ -b^{5, 74}_1 ∨ -b^{5, 74}_0 ∨ false 
c  in DIMACS:
-8648 -8649 -8650  0

c i = 75
c  -2+1 --> -1
c    ( b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧  p_375) -> ( b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0)
c  in CNF:
c    -b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨  b^{5, 76}_2
c    -b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_1
c    -b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨  b^{5, 76}_0
c  in DIMACS:
-8651 -8652  8653 -375  8654 0
-8651 -8652  8653 -375 -8655 0
-8651 -8652  8653 -375  8656 0

c  -1+1 --> 0
c    ( b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0 ∧  p_375) -> (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧ -b^{5, 76}_0)
c  in CNF:
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_2
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_1
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_0
c  in DIMACS:
-8651  8652 -8653 -375 -8654 0
-8651  8652 -8653 -375 -8655 0
-8651  8652 -8653 -375 -8656 0

c  0+1 --> 1
c    (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧  p_375) -> (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0)
c  in CNF:
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_2
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_1
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨  b^{5, 76}_0
c  in DIMACS:
 8651  8652  8653 -375 -8654 0
 8651  8652  8653 -375 -8655 0
 8651  8652  8653 -375  8656 0

c  1+1 --> 2
c    (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0 ∧  p_375) -> (-b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0)
c  in CNF:
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_2
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨  b^{5, 76}_1
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ -p_375 ∨ -b^{5, 76}_0
c  in DIMACS:
 8651  8652 -8653 -375 -8654 0
 8651  8652 -8653 -375  8655 0
 8651  8652 -8653 -375 -8656 0

c  2+1 --> break 
c    (-b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧  p_375) -> break
c  in CNF:
c     b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 8651 -8652  8653 -375 1162 0


c  2-1 --> 1
c    (-b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧ -p_375) -> (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0)
c  in CNF:
c     b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_2
c     b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_1
c     b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨  b^{5, 76}_0
c  in DIMACS:
 8651 -8652  8653  375 -8654 0
 8651 -8652  8653  375 -8655 0
 8651 -8652  8653  375  8656 0

c  1-1 --> 0
c    (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0 ∧ -p_375) -> (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧ -b^{5, 76}_0)
c  in CNF:
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_2
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_1
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_0
c  in DIMACS:
 8651  8652 -8653  375 -8654 0
 8651  8652 -8653  375 -8655 0
 8651  8652 -8653  375 -8656 0

c  0-1 --> -1
c    (-b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧ -p_375) -> ( b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0)
c  in CNF:
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨  b^{5, 76}_2
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_1
c     b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨  b^{5, 76}_0
c  in DIMACS:
 8651  8652  8653  375  8654 0
 8651  8652  8653  375 -8655 0
 8651  8652  8653  375  8656 0

c  -1-1 --> -2
c    ( b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧  b^{5, 75}_0 ∧ -p_375) -> ( b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0)
c  in CNF:
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨  b^{5, 76}_2
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨  b^{5, 76}_1
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨  p_375 ∨ -b^{5, 76}_0
c  in DIMACS:
-8651  8652 -8653  375  8654 0
-8651  8652 -8653  375  8655 0
-8651  8652 -8653  375 -8656 0

c  -2-1 --> break 
c    ( b^{5, 75}_2 ∧  b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨  b^{5, 75}_0 ∨  p_375 ∨ break
c  in DIMACS:
-8651 -8652  8653  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 75}_2 ∧ -b^{5, 75}_1 ∧ -b^{5, 75}_0 ∧ true) 
c  in CNF:
c    -b^{5, 75}_2 ∨  b^{5, 75}_1 ∨  b^{5, 75}_0 ∨ false 
c  in DIMACS:
-8651  8652  8653  0

c  3 does not represent an automaton state.
c    -(-b^{5, 75}_2 ∧  b^{5, 75}_1 ∧  b^{5, 75}_0 ∧ true) 
c  in CNF:
c     b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ false 
c  in DIMACS:
 8651 -8652 -8653  0
c  -3 does not represent an automaton state.
c    -( b^{5, 75}_2 ∧  b^{5, 75}_1 ∧  b^{5, 75}_0 ∧ true) 
c  in CNF:
c    -b^{5, 75}_2 ∨ -b^{5, 75}_1 ∨ -b^{5, 75}_0 ∨ false 
c  in DIMACS:
-8651 -8652 -8653  0

c i = 76
c  -2+1 --> -1
c    ( b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧  p_380) -> ( b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0)
c  in CNF:
c    -b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨  b^{5, 77}_2
c    -b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_1
c    -b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨  b^{5, 77}_0
c  in DIMACS:
-8654 -8655  8656 -380  8657 0
-8654 -8655  8656 -380 -8658 0
-8654 -8655  8656 -380  8659 0

c  -1+1 --> 0
c    ( b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0 ∧  p_380) -> (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧ -b^{5, 77}_0)
c  in CNF:
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_2
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_1
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_0
c  in DIMACS:
-8654  8655 -8656 -380 -8657 0
-8654  8655 -8656 -380 -8658 0
-8654  8655 -8656 -380 -8659 0

c  0+1 --> 1
c    (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧  p_380) -> (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0)
c  in CNF:
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_2
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_1
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨  b^{5, 77}_0
c  in DIMACS:
 8654  8655  8656 -380 -8657 0
 8654  8655  8656 -380 -8658 0
 8654  8655  8656 -380  8659 0

c  1+1 --> 2
c    (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0 ∧  p_380) -> (-b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0)
c  in CNF:
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_2
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨  b^{5, 77}_1
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ -p_380 ∨ -b^{5, 77}_0
c  in DIMACS:
 8654  8655 -8656 -380 -8657 0
 8654  8655 -8656 -380  8658 0
 8654  8655 -8656 -380 -8659 0

c  2+1 --> break 
c    (-b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧  p_380) -> break
c  in CNF:
c     b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 8654 -8655  8656 -380 1162 0


c  2-1 --> 1
c    (-b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧ -p_380) -> (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0)
c  in CNF:
c     b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_2
c     b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_1
c     b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨  b^{5, 77}_0
c  in DIMACS:
 8654 -8655  8656  380 -8657 0
 8654 -8655  8656  380 -8658 0
 8654 -8655  8656  380  8659 0

c  1-1 --> 0
c    (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0 ∧ -p_380) -> (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧ -b^{5, 77}_0)
c  in CNF:
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_2
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_1
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_0
c  in DIMACS:
 8654  8655 -8656  380 -8657 0
 8654  8655 -8656  380 -8658 0
 8654  8655 -8656  380 -8659 0

c  0-1 --> -1
c    (-b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧ -p_380) -> ( b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0)
c  in CNF:
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨  b^{5, 77}_2
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_1
c     b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨  b^{5, 77}_0
c  in DIMACS:
 8654  8655  8656  380  8657 0
 8654  8655  8656  380 -8658 0
 8654  8655  8656  380  8659 0

c  -1-1 --> -2
c    ( b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧  b^{5, 76}_0 ∧ -p_380) -> ( b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0)
c  in CNF:
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨  b^{5, 77}_2
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨  b^{5, 77}_1
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨  p_380 ∨ -b^{5, 77}_0
c  in DIMACS:
-8654  8655 -8656  380  8657 0
-8654  8655 -8656  380  8658 0
-8654  8655 -8656  380 -8659 0

c  -2-1 --> break 
c    ( b^{5, 76}_2 ∧  b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨  b^{5, 76}_0 ∨  p_380 ∨ break
c  in DIMACS:
-8654 -8655  8656  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 76}_2 ∧ -b^{5, 76}_1 ∧ -b^{5, 76}_0 ∧ true) 
c  in CNF:
c    -b^{5, 76}_2 ∨  b^{5, 76}_1 ∨  b^{5, 76}_0 ∨ false 
c  in DIMACS:
-8654  8655  8656  0

c  3 does not represent an automaton state.
c    -(-b^{5, 76}_2 ∧  b^{5, 76}_1 ∧  b^{5, 76}_0 ∧ true) 
c  in CNF:
c     b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ false 
c  in DIMACS:
 8654 -8655 -8656  0
c  -3 does not represent an automaton state.
c    -( b^{5, 76}_2 ∧  b^{5, 76}_1 ∧  b^{5, 76}_0 ∧ true) 
c  in CNF:
c    -b^{5, 76}_2 ∨ -b^{5, 76}_1 ∨ -b^{5, 76}_0 ∨ false 
c  in DIMACS:
-8654 -8655 -8656  0

c i = 77
c  -2+1 --> -1
c    ( b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧  p_385) -> ( b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0)
c  in CNF:
c    -b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨  b^{5, 78}_2
c    -b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_1
c    -b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨  b^{5, 78}_0
c  in DIMACS:
-8657 -8658  8659 -385  8660 0
-8657 -8658  8659 -385 -8661 0
-8657 -8658  8659 -385  8662 0

c  -1+1 --> 0
c    ( b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0 ∧  p_385) -> (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧ -b^{5, 78}_0)
c  in CNF:
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_2
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_1
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_0
c  in DIMACS:
-8657  8658 -8659 -385 -8660 0
-8657  8658 -8659 -385 -8661 0
-8657  8658 -8659 -385 -8662 0

c  0+1 --> 1
c    (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧  p_385) -> (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0)
c  in CNF:
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_2
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_1
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨  b^{5, 78}_0
c  in DIMACS:
 8657  8658  8659 -385 -8660 0
 8657  8658  8659 -385 -8661 0
 8657  8658  8659 -385  8662 0

c  1+1 --> 2
c    (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0 ∧  p_385) -> (-b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0)
c  in CNF:
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_2
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨  b^{5, 78}_1
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ -p_385 ∨ -b^{5, 78}_0
c  in DIMACS:
 8657  8658 -8659 -385 -8660 0
 8657  8658 -8659 -385  8661 0
 8657  8658 -8659 -385 -8662 0

c  2+1 --> break 
c    (-b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧  p_385) -> break
c  in CNF:
c     b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 8657 -8658  8659 -385 1162 0


c  2-1 --> 1
c    (-b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧ -p_385) -> (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0)
c  in CNF:
c     b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_2
c     b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_1
c     b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨  b^{5, 78}_0
c  in DIMACS:
 8657 -8658  8659  385 -8660 0
 8657 -8658  8659  385 -8661 0
 8657 -8658  8659  385  8662 0

c  1-1 --> 0
c    (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0 ∧ -p_385) -> (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧ -b^{5, 78}_0)
c  in CNF:
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_2
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_1
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_0
c  in DIMACS:
 8657  8658 -8659  385 -8660 0
 8657  8658 -8659  385 -8661 0
 8657  8658 -8659  385 -8662 0

c  0-1 --> -1
c    (-b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧ -p_385) -> ( b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0)
c  in CNF:
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨  b^{5, 78}_2
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_1
c     b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨  b^{5, 78}_0
c  in DIMACS:
 8657  8658  8659  385  8660 0
 8657  8658  8659  385 -8661 0
 8657  8658  8659  385  8662 0

c  -1-1 --> -2
c    ( b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧  b^{5, 77}_0 ∧ -p_385) -> ( b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0)
c  in CNF:
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨  b^{5, 78}_2
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨  b^{5, 78}_1
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨  p_385 ∨ -b^{5, 78}_0
c  in DIMACS:
-8657  8658 -8659  385  8660 0
-8657  8658 -8659  385  8661 0
-8657  8658 -8659  385 -8662 0

c  -2-1 --> break 
c    ( b^{5, 77}_2 ∧  b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨  b^{5, 77}_0 ∨  p_385 ∨ break
c  in DIMACS:
-8657 -8658  8659  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 77}_2 ∧ -b^{5, 77}_1 ∧ -b^{5, 77}_0 ∧ true) 
c  in CNF:
c    -b^{5, 77}_2 ∨  b^{5, 77}_1 ∨  b^{5, 77}_0 ∨ false 
c  in DIMACS:
-8657  8658  8659  0

c  3 does not represent an automaton state.
c    -(-b^{5, 77}_2 ∧  b^{5, 77}_1 ∧  b^{5, 77}_0 ∧ true) 
c  in CNF:
c     b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ false 
c  in DIMACS:
 8657 -8658 -8659  0
c  -3 does not represent an automaton state.
c    -( b^{5, 77}_2 ∧  b^{5, 77}_1 ∧  b^{5, 77}_0 ∧ true) 
c  in CNF:
c    -b^{5, 77}_2 ∨ -b^{5, 77}_1 ∨ -b^{5, 77}_0 ∨ false 
c  in DIMACS:
-8657 -8658 -8659  0

c i = 78
c  -2+1 --> -1
c    ( b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧  p_390) -> ( b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0)
c  in CNF:
c    -b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨  b^{5, 79}_2
c    -b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_1
c    -b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨  b^{5, 79}_0
c  in DIMACS:
-8660 -8661  8662 -390  8663 0
-8660 -8661  8662 -390 -8664 0
-8660 -8661  8662 -390  8665 0

c  -1+1 --> 0
c    ( b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0 ∧  p_390) -> (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧ -b^{5, 79}_0)
c  in CNF:
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_2
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_1
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_0
c  in DIMACS:
-8660  8661 -8662 -390 -8663 0
-8660  8661 -8662 -390 -8664 0
-8660  8661 -8662 -390 -8665 0

c  0+1 --> 1
c    (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧  p_390) -> (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0)
c  in CNF:
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_2
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_1
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨  b^{5, 79}_0
c  in DIMACS:
 8660  8661  8662 -390 -8663 0
 8660  8661  8662 -390 -8664 0
 8660  8661  8662 -390  8665 0

c  1+1 --> 2
c    (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0 ∧  p_390) -> (-b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0)
c  in CNF:
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_2
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨  b^{5, 79}_1
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ -p_390 ∨ -b^{5, 79}_0
c  in DIMACS:
 8660  8661 -8662 -390 -8663 0
 8660  8661 -8662 -390  8664 0
 8660  8661 -8662 -390 -8665 0

c  2+1 --> break 
c    (-b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧  p_390) -> break
c  in CNF:
c     b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 8660 -8661  8662 -390 1162 0


c  2-1 --> 1
c    (-b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧ -p_390) -> (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0)
c  in CNF:
c     b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_2
c     b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_1
c     b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨  b^{5, 79}_0
c  in DIMACS:
 8660 -8661  8662  390 -8663 0
 8660 -8661  8662  390 -8664 0
 8660 -8661  8662  390  8665 0

c  1-1 --> 0
c    (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0 ∧ -p_390) -> (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧ -b^{5, 79}_0)
c  in CNF:
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_2
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_1
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_0
c  in DIMACS:
 8660  8661 -8662  390 -8663 0
 8660  8661 -8662  390 -8664 0
 8660  8661 -8662  390 -8665 0

c  0-1 --> -1
c    (-b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧ -p_390) -> ( b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0)
c  in CNF:
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨  b^{5, 79}_2
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_1
c     b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨  b^{5, 79}_0
c  in DIMACS:
 8660  8661  8662  390  8663 0
 8660  8661  8662  390 -8664 0
 8660  8661  8662  390  8665 0

c  -1-1 --> -2
c    ( b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧  b^{5, 78}_0 ∧ -p_390) -> ( b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0)
c  in CNF:
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨  b^{5, 79}_2
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨  b^{5, 79}_1
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨  p_390 ∨ -b^{5, 79}_0
c  in DIMACS:
-8660  8661 -8662  390  8663 0
-8660  8661 -8662  390  8664 0
-8660  8661 -8662  390 -8665 0

c  -2-1 --> break 
c    ( b^{5, 78}_2 ∧  b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨  b^{5, 78}_0 ∨  p_390 ∨ break
c  in DIMACS:
-8660 -8661  8662  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 78}_2 ∧ -b^{5, 78}_1 ∧ -b^{5, 78}_0 ∧ true) 
c  in CNF:
c    -b^{5, 78}_2 ∨  b^{5, 78}_1 ∨  b^{5, 78}_0 ∨ false 
c  in DIMACS:
-8660  8661  8662  0

c  3 does not represent an automaton state.
c    -(-b^{5, 78}_2 ∧  b^{5, 78}_1 ∧  b^{5, 78}_0 ∧ true) 
c  in CNF:
c     b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ false 
c  in DIMACS:
 8660 -8661 -8662  0
c  -3 does not represent an automaton state.
c    -( b^{5, 78}_2 ∧  b^{5, 78}_1 ∧  b^{5, 78}_0 ∧ true) 
c  in CNF:
c    -b^{5, 78}_2 ∨ -b^{5, 78}_1 ∨ -b^{5, 78}_0 ∨ false 
c  in DIMACS:
-8660 -8661 -8662  0

c i = 79
c  -2+1 --> -1
c    ( b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧  p_395) -> ( b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0)
c  in CNF:
c    -b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨  b^{5, 80}_2
c    -b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_1
c    -b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨  b^{5, 80}_0
c  in DIMACS:
-8663 -8664  8665 -395  8666 0
-8663 -8664  8665 -395 -8667 0
-8663 -8664  8665 -395  8668 0

c  -1+1 --> 0
c    ( b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0 ∧  p_395) -> (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧ -b^{5, 80}_0)
c  in CNF:
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_2
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_1
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_0
c  in DIMACS:
-8663  8664 -8665 -395 -8666 0
-8663  8664 -8665 -395 -8667 0
-8663  8664 -8665 -395 -8668 0

c  0+1 --> 1
c    (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧  p_395) -> (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0)
c  in CNF:
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_2
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_1
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨  b^{5, 80}_0
c  in DIMACS:
 8663  8664  8665 -395 -8666 0
 8663  8664  8665 -395 -8667 0
 8663  8664  8665 -395  8668 0

c  1+1 --> 2
c    (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0 ∧  p_395) -> (-b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0)
c  in CNF:
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_2
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨  b^{5, 80}_1
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ -p_395 ∨ -b^{5, 80}_0
c  in DIMACS:
 8663  8664 -8665 -395 -8666 0
 8663  8664 -8665 -395  8667 0
 8663  8664 -8665 -395 -8668 0

c  2+1 --> break 
c    (-b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧  p_395) -> break
c  in CNF:
c     b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ -p_395 ∨ break
c  in DIMACS:
 8663 -8664  8665 -395 1162 0


c  2-1 --> 1
c    (-b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧ -p_395) -> (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0)
c  in CNF:
c     b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_2
c     b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_1
c     b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨  b^{5, 80}_0
c  in DIMACS:
 8663 -8664  8665  395 -8666 0
 8663 -8664  8665  395 -8667 0
 8663 -8664  8665  395  8668 0

c  1-1 --> 0
c    (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0 ∧ -p_395) -> (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧ -b^{5, 80}_0)
c  in CNF:
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_2
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_1
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_0
c  in DIMACS:
 8663  8664 -8665  395 -8666 0
 8663  8664 -8665  395 -8667 0
 8663  8664 -8665  395 -8668 0

c  0-1 --> -1
c    (-b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧ -p_395) -> ( b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0)
c  in CNF:
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨  b^{5, 80}_2
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_1
c     b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨  b^{5, 80}_0
c  in DIMACS:
 8663  8664  8665  395  8666 0
 8663  8664  8665  395 -8667 0
 8663  8664  8665  395  8668 0

c  -1-1 --> -2
c    ( b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧  b^{5, 79}_0 ∧ -p_395) -> ( b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0)
c  in CNF:
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨  b^{5, 80}_2
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨  b^{5, 80}_1
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨  p_395 ∨ -b^{5, 80}_0
c  in DIMACS:
-8663  8664 -8665  395  8666 0
-8663  8664 -8665  395  8667 0
-8663  8664 -8665  395 -8668 0

c  -2-1 --> break 
c    ( b^{5, 79}_2 ∧  b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧ -p_395) -> break
c  in CNF:
c    -b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨  b^{5, 79}_0 ∨  p_395 ∨ break
c  in DIMACS:
-8663 -8664  8665  395 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 79}_2 ∧ -b^{5, 79}_1 ∧ -b^{5, 79}_0 ∧ true) 
c  in CNF:
c    -b^{5, 79}_2 ∨  b^{5, 79}_1 ∨  b^{5, 79}_0 ∨ false 
c  in DIMACS:
-8663  8664  8665  0

c  3 does not represent an automaton state.
c    -(-b^{5, 79}_2 ∧  b^{5, 79}_1 ∧  b^{5, 79}_0 ∧ true) 
c  in CNF:
c     b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ false 
c  in DIMACS:
 8663 -8664 -8665  0
c  -3 does not represent an automaton state.
c    -( b^{5, 79}_2 ∧  b^{5, 79}_1 ∧  b^{5, 79}_0 ∧ true) 
c  in CNF:
c    -b^{5, 79}_2 ∨ -b^{5, 79}_1 ∨ -b^{5, 79}_0 ∨ false 
c  in DIMACS:
-8663 -8664 -8665  0

c i = 80
c  -2+1 --> -1
c    ( b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧  p_400) -> ( b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0)
c  in CNF:
c    -b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨  b^{5, 81}_2
c    -b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_1
c    -b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨  b^{5, 81}_0
c  in DIMACS:
-8666 -8667  8668 -400  8669 0
-8666 -8667  8668 -400 -8670 0
-8666 -8667  8668 -400  8671 0

c  -1+1 --> 0
c    ( b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0 ∧  p_400) -> (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧ -b^{5, 81}_0)
c  in CNF:
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_2
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_1
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_0
c  in DIMACS:
-8666  8667 -8668 -400 -8669 0
-8666  8667 -8668 -400 -8670 0
-8666  8667 -8668 -400 -8671 0

c  0+1 --> 1
c    (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧  p_400) -> (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0)
c  in CNF:
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_2
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_1
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨  b^{5, 81}_0
c  in DIMACS:
 8666  8667  8668 -400 -8669 0
 8666  8667  8668 -400 -8670 0
 8666  8667  8668 -400  8671 0

c  1+1 --> 2
c    (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0 ∧  p_400) -> (-b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0)
c  in CNF:
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_2
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨  b^{5, 81}_1
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ -p_400 ∨ -b^{5, 81}_0
c  in DIMACS:
 8666  8667 -8668 -400 -8669 0
 8666  8667 -8668 -400  8670 0
 8666  8667 -8668 -400 -8671 0

c  2+1 --> break 
c    (-b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧  p_400) -> break
c  in CNF:
c     b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 8666 -8667  8668 -400 1162 0


c  2-1 --> 1
c    (-b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧ -p_400) -> (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0)
c  in CNF:
c     b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_2
c     b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_1
c     b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨  b^{5, 81}_0
c  in DIMACS:
 8666 -8667  8668  400 -8669 0
 8666 -8667  8668  400 -8670 0
 8666 -8667  8668  400  8671 0

c  1-1 --> 0
c    (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0 ∧ -p_400) -> (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧ -b^{5, 81}_0)
c  in CNF:
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_2
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_1
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_0
c  in DIMACS:
 8666  8667 -8668  400 -8669 0
 8666  8667 -8668  400 -8670 0
 8666  8667 -8668  400 -8671 0

c  0-1 --> -1
c    (-b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧ -p_400) -> ( b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0)
c  in CNF:
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨  b^{5, 81}_2
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_1
c     b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨  b^{5, 81}_0
c  in DIMACS:
 8666  8667  8668  400  8669 0
 8666  8667  8668  400 -8670 0
 8666  8667  8668  400  8671 0

c  -1-1 --> -2
c    ( b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧  b^{5, 80}_0 ∧ -p_400) -> ( b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0)
c  in CNF:
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨  b^{5, 81}_2
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨  b^{5, 81}_1
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨  p_400 ∨ -b^{5, 81}_0
c  in DIMACS:
-8666  8667 -8668  400  8669 0
-8666  8667 -8668  400  8670 0
-8666  8667 -8668  400 -8671 0

c  -2-1 --> break 
c    ( b^{5, 80}_2 ∧  b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨  b^{5, 80}_0 ∨  p_400 ∨ break
c  in DIMACS:
-8666 -8667  8668  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 80}_2 ∧ -b^{5, 80}_1 ∧ -b^{5, 80}_0 ∧ true) 
c  in CNF:
c    -b^{5, 80}_2 ∨  b^{5, 80}_1 ∨  b^{5, 80}_0 ∨ false 
c  in DIMACS:
-8666  8667  8668  0

c  3 does not represent an automaton state.
c    -(-b^{5, 80}_2 ∧  b^{5, 80}_1 ∧  b^{5, 80}_0 ∧ true) 
c  in CNF:
c     b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ false 
c  in DIMACS:
 8666 -8667 -8668  0
c  -3 does not represent an automaton state.
c    -( b^{5, 80}_2 ∧  b^{5, 80}_1 ∧  b^{5, 80}_0 ∧ true) 
c  in CNF:
c    -b^{5, 80}_2 ∨ -b^{5, 80}_1 ∨ -b^{5, 80}_0 ∨ false 
c  in DIMACS:
-8666 -8667 -8668  0

c i = 81
c  -2+1 --> -1
c    ( b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧  p_405) -> ( b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0)
c  in CNF:
c    -b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨  b^{5, 82}_2
c    -b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_1
c    -b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨  b^{5, 82}_0
c  in DIMACS:
-8669 -8670  8671 -405  8672 0
-8669 -8670  8671 -405 -8673 0
-8669 -8670  8671 -405  8674 0

c  -1+1 --> 0
c    ( b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0 ∧  p_405) -> (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧ -b^{5, 82}_0)
c  in CNF:
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_2
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_1
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_0
c  in DIMACS:
-8669  8670 -8671 -405 -8672 0
-8669  8670 -8671 -405 -8673 0
-8669  8670 -8671 -405 -8674 0

c  0+1 --> 1
c    (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧  p_405) -> (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0)
c  in CNF:
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_2
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_1
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨  b^{5, 82}_0
c  in DIMACS:
 8669  8670  8671 -405 -8672 0
 8669  8670  8671 -405 -8673 0
 8669  8670  8671 -405  8674 0

c  1+1 --> 2
c    (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0 ∧  p_405) -> (-b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0)
c  in CNF:
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_2
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨  b^{5, 82}_1
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ -p_405 ∨ -b^{5, 82}_0
c  in DIMACS:
 8669  8670 -8671 -405 -8672 0
 8669  8670 -8671 -405  8673 0
 8669  8670 -8671 -405 -8674 0

c  2+1 --> break 
c    (-b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧  p_405) -> break
c  in CNF:
c     b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 8669 -8670  8671 -405 1162 0


c  2-1 --> 1
c    (-b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧ -p_405) -> (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0)
c  in CNF:
c     b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_2
c     b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_1
c     b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨  b^{5, 82}_0
c  in DIMACS:
 8669 -8670  8671  405 -8672 0
 8669 -8670  8671  405 -8673 0
 8669 -8670  8671  405  8674 0

c  1-1 --> 0
c    (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0 ∧ -p_405) -> (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧ -b^{5, 82}_0)
c  in CNF:
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_2
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_1
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_0
c  in DIMACS:
 8669  8670 -8671  405 -8672 0
 8669  8670 -8671  405 -8673 0
 8669  8670 -8671  405 -8674 0

c  0-1 --> -1
c    (-b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧ -p_405) -> ( b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0)
c  in CNF:
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨  b^{5, 82}_2
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_1
c     b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨  b^{5, 82}_0
c  in DIMACS:
 8669  8670  8671  405  8672 0
 8669  8670  8671  405 -8673 0
 8669  8670  8671  405  8674 0

c  -1-1 --> -2
c    ( b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧  b^{5, 81}_0 ∧ -p_405) -> ( b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0)
c  in CNF:
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨  b^{5, 82}_2
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨  b^{5, 82}_1
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨  p_405 ∨ -b^{5, 82}_0
c  in DIMACS:
-8669  8670 -8671  405  8672 0
-8669  8670 -8671  405  8673 0
-8669  8670 -8671  405 -8674 0

c  -2-1 --> break 
c    ( b^{5, 81}_2 ∧  b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨  b^{5, 81}_0 ∨  p_405 ∨ break
c  in DIMACS:
-8669 -8670  8671  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 81}_2 ∧ -b^{5, 81}_1 ∧ -b^{5, 81}_0 ∧ true) 
c  in CNF:
c    -b^{5, 81}_2 ∨  b^{5, 81}_1 ∨  b^{5, 81}_0 ∨ false 
c  in DIMACS:
-8669  8670  8671  0

c  3 does not represent an automaton state.
c    -(-b^{5, 81}_2 ∧  b^{5, 81}_1 ∧  b^{5, 81}_0 ∧ true) 
c  in CNF:
c     b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ false 
c  in DIMACS:
 8669 -8670 -8671  0
c  -3 does not represent an automaton state.
c    -( b^{5, 81}_2 ∧  b^{5, 81}_1 ∧  b^{5, 81}_0 ∧ true) 
c  in CNF:
c    -b^{5, 81}_2 ∨ -b^{5, 81}_1 ∨ -b^{5, 81}_0 ∨ false 
c  in DIMACS:
-8669 -8670 -8671  0

c i = 82
c  -2+1 --> -1
c    ( b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧  p_410) -> ( b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0)
c  in CNF:
c    -b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨  b^{5, 83}_2
c    -b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_1
c    -b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨  b^{5, 83}_0
c  in DIMACS:
-8672 -8673  8674 -410  8675 0
-8672 -8673  8674 -410 -8676 0
-8672 -8673  8674 -410  8677 0

c  -1+1 --> 0
c    ( b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0 ∧  p_410) -> (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧ -b^{5, 83}_0)
c  in CNF:
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_2
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_1
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_0
c  in DIMACS:
-8672  8673 -8674 -410 -8675 0
-8672  8673 -8674 -410 -8676 0
-8672  8673 -8674 -410 -8677 0

c  0+1 --> 1
c    (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧  p_410) -> (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0)
c  in CNF:
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_2
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_1
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨  b^{5, 83}_0
c  in DIMACS:
 8672  8673  8674 -410 -8675 0
 8672  8673  8674 -410 -8676 0
 8672  8673  8674 -410  8677 0

c  1+1 --> 2
c    (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0 ∧  p_410) -> (-b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0)
c  in CNF:
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_2
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨  b^{5, 83}_1
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ -p_410 ∨ -b^{5, 83}_0
c  in DIMACS:
 8672  8673 -8674 -410 -8675 0
 8672  8673 -8674 -410  8676 0
 8672  8673 -8674 -410 -8677 0

c  2+1 --> break 
c    (-b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧  p_410) -> break
c  in CNF:
c     b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 8672 -8673  8674 -410 1162 0


c  2-1 --> 1
c    (-b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧ -p_410) -> (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0)
c  in CNF:
c     b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_2
c     b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_1
c     b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨  b^{5, 83}_0
c  in DIMACS:
 8672 -8673  8674  410 -8675 0
 8672 -8673  8674  410 -8676 0
 8672 -8673  8674  410  8677 0

c  1-1 --> 0
c    (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0 ∧ -p_410) -> (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧ -b^{5, 83}_0)
c  in CNF:
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_2
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_1
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_0
c  in DIMACS:
 8672  8673 -8674  410 -8675 0
 8672  8673 -8674  410 -8676 0
 8672  8673 -8674  410 -8677 0

c  0-1 --> -1
c    (-b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧ -p_410) -> ( b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0)
c  in CNF:
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨  b^{5, 83}_2
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_1
c     b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨  b^{5, 83}_0
c  in DIMACS:
 8672  8673  8674  410  8675 0
 8672  8673  8674  410 -8676 0
 8672  8673  8674  410  8677 0

c  -1-1 --> -2
c    ( b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧  b^{5, 82}_0 ∧ -p_410) -> ( b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0)
c  in CNF:
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨  b^{5, 83}_2
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨  b^{5, 83}_1
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨  p_410 ∨ -b^{5, 83}_0
c  in DIMACS:
-8672  8673 -8674  410  8675 0
-8672  8673 -8674  410  8676 0
-8672  8673 -8674  410 -8677 0

c  -2-1 --> break 
c    ( b^{5, 82}_2 ∧  b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨  b^{5, 82}_0 ∨  p_410 ∨ break
c  in DIMACS:
-8672 -8673  8674  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 82}_2 ∧ -b^{5, 82}_1 ∧ -b^{5, 82}_0 ∧ true) 
c  in CNF:
c    -b^{5, 82}_2 ∨  b^{5, 82}_1 ∨  b^{5, 82}_0 ∨ false 
c  in DIMACS:
-8672  8673  8674  0

c  3 does not represent an automaton state.
c    -(-b^{5, 82}_2 ∧  b^{5, 82}_1 ∧  b^{5, 82}_0 ∧ true) 
c  in CNF:
c     b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ false 
c  in DIMACS:
 8672 -8673 -8674  0
c  -3 does not represent an automaton state.
c    -( b^{5, 82}_2 ∧  b^{5, 82}_1 ∧  b^{5, 82}_0 ∧ true) 
c  in CNF:
c    -b^{5, 82}_2 ∨ -b^{5, 82}_1 ∨ -b^{5, 82}_0 ∨ false 
c  in DIMACS:
-8672 -8673 -8674  0

c i = 83
c  -2+1 --> -1
c    ( b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧  p_415) -> ( b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0)
c  in CNF:
c    -b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨  b^{5, 84}_2
c    -b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_1
c    -b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨  b^{5, 84}_0
c  in DIMACS:
-8675 -8676  8677 -415  8678 0
-8675 -8676  8677 -415 -8679 0
-8675 -8676  8677 -415  8680 0

c  -1+1 --> 0
c    ( b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0 ∧  p_415) -> (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧ -b^{5, 84}_0)
c  in CNF:
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_2
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_1
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_0
c  in DIMACS:
-8675  8676 -8677 -415 -8678 0
-8675  8676 -8677 -415 -8679 0
-8675  8676 -8677 -415 -8680 0

c  0+1 --> 1
c    (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧  p_415) -> (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0)
c  in CNF:
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_2
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_1
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨  b^{5, 84}_0
c  in DIMACS:
 8675  8676  8677 -415 -8678 0
 8675  8676  8677 -415 -8679 0
 8675  8676  8677 -415  8680 0

c  1+1 --> 2
c    (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0 ∧  p_415) -> (-b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0)
c  in CNF:
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_2
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨  b^{5, 84}_1
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ -p_415 ∨ -b^{5, 84}_0
c  in DIMACS:
 8675  8676 -8677 -415 -8678 0
 8675  8676 -8677 -415  8679 0
 8675  8676 -8677 -415 -8680 0

c  2+1 --> break 
c    (-b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧  p_415) -> break
c  in CNF:
c     b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ -p_415 ∨ break
c  in DIMACS:
 8675 -8676  8677 -415 1162 0


c  2-1 --> 1
c    (-b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧ -p_415) -> (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0)
c  in CNF:
c     b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_2
c     b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_1
c     b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨  b^{5, 84}_0
c  in DIMACS:
 8675 -8676  8677  415 -8678 0
 8675 -8676  8677  415 -8679 0
 8675 -8676  8677  415  8680 0

c  1-1 --> 0
c    (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0 ∧ -p_415) -> (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧ -b^{5, 84}_0)
c  in CNF:
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_2
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_1
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_0
c  in DIMACS:
 8675  8676 -8677  415 -8678 0
 8675  8676 -8677  415 -8679 0
 8675  8676 -8677  415 -8680 0

c  0-1 --> -1
c    (-b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧ -p_415) -> ( b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0)
c  in CNF:
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨  b^{5, 84}_2
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_1
c     b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨  b^{5, 84}_0
c  in DIMACS:
 8675  8676  8677  415  8678 0
 8675  8676  8677  415 -8679 0
 8675  8676  8677  415  8680 0

c  -1-1 --> -2
c    ( b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧  b^{5, 83}_0 ∧ -p_415) -> ( b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0)
c  in CNF:
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨  b^{5, 84}_2
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨  b^{5, 84}_1
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨  p_415 ∨ -b^{5, 84}_0
c  in DIMACS:
-8675  8676 -8677  415  8678 0
-8675  8676 -8677  415  8679 0
-8675  8676 -8677  415 -8680 0

c  -2-1 --> break 
c    ( b^{5, 83}_2 ∧  b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧ -p_415) -> break
c  in CNF:
c    -b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨  b^{5, 83}_0 ∨  p_415 ∨ break
c  in DIMACS:
-8675 -8676  8677  415 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 83}_2 ∧ -b^{5, 83}_1 ∧ -b^{5, 83}_0 ∧ true) 
c  in CNF:
c    -b^{5, 83}_2 ∨  b^{5, 83}_1 ∨  b^{5, 83}_0 ∨ false 
c  in DIMACS:
-8675  8676  8677  0

c  3 does not represent an automaton state.
c    -(-b^{5, 83}_2 ∧  b^{5, 83}_1 ∧  b^{5, 83}_0 ∧ true) 
c  in CNF:
c     b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ false 
c  in DIMACS:
 8675 -8676 -8677  0
c  -3 does not represent an automaton state.
c    -( b^{5, 83}_2 ∧  b^{5, 83}_1 ∧  b^{5, 83}_0 ∧ true) 
c  in CNF:
c    -b^{5, 83}_2 ∨ -b^{5, 83}_1 ∨ -b^{5, 83}_0 ∨ false 
c  in DIMACS:
-8675 -8676 -8677  0

c i = 84
c  -2+1 --> -1
c    ( b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧  p_420) -> ( b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0)
c  in CNF:
c    -b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨  b^{5, 85}_2
c    -b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_1
c    -b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨  b^{5, 85}_0
c  in DIMACS:
-8678 -8679  8680 -420  8681 0
-8678 -8679  8680 -420 -8682 0
-8678 -8679  8680 -420  8683 0

c  -1+1 --> 0
c    ( b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0 ∧  p_420) -> (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧ -b^{5, 85}_0)
c  in CNF:
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_2
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_1
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_0
c  in DIMACS:
-8678  8679 -8680 -420 -8681 0
-8678  8679 -8680 -420 -8682 0
-8678  8679 -8680 -420 -8683 0

c  0+1 --> 1
c    (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧  p_420) -> (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0)
c  in CNF:
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_2
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_1
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨  b^{5, 85}_0
c  in DIMACS:
 8678  8679  8680 -420 -8681 0
 8678  8679  8680 -420 -8682 0
 8678  8679  8680 -420  8683 0

c  1+1 --> 2
c    (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0 ∧  p_420) -> (-b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0)
c  in CNF:
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_2
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨  b^{5, 85}_1
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ -p_420 ∨ -b^{5, 85}_0
c  in DIMACS:
 8678  8679 -8680 -420 -8681 0
 8678  8679 -8680 -420  8682 0
 8678  8679 -8680 -420 -8683 0

c  2+1 --> break 
c    (-b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧  p_420) -> break
c  in CNF:
c     b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 8678 -8679  8680 -420 1162 0


c  2-1 --> 1
c    (-b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧ -p_420) -> (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0)
c  in CNF:
c     b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_2
c     b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_1
c     b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨  b^{5, 85}_0
c  in DIMACS:
 8678 -8679  8680  420 -8681 0
 8678 -8679  8680  420 -8682 0
 8678 -8679  8680  420  8683 0

c  1-1 --> 0
c    (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0 ∧ -p_420) -> (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧ -b^{5, 85}_0)
c  in CNF:
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_2
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_1
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_0
c  in DIMACS:
 8678  8679 -8680  420 -8681 0
 8678  8679 -8680  420 -8682 0
 8678  8679 -8680  420 -8683 0

c  0-1 --> -1
c    (-b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧ -p_420) -> ( b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0)
c  in CNF:
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨  b^{5, 85}_2
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_1
c     b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨  b^{5, 85}_0
c  in DIMACS:
 8678  8679  8680  420  8681 0
 8678  8679  8680  420 -8682 0
 8678  8679  8680  420  8683 0

c  -1-1 --> -2
c    ( b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧  b^{5, 84}_0 ∧ -p_420) -> ( b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0)
c  in CNF:
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨  b^{5, 85}_2
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨  b^{5, 85}_1
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨  p_420 ∨ -b^{5, 85}_0
c  in DIMACS:
-8678  8679 -8680  420  8681 0
-8678  8679 -8680  420  8682 0
-8678  8679 -8680  420 -8683 0

c  -2-1 --> break 
c    ( b^{5, 84}_2 ∧  b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨  b^{5, 84}_0 ∨  p_420 ∨ break
c  in DIMACS:
-8678 -8679  8680  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 84}_2 ∧ -b^{5, 84}_1 ∧ -b^{5, 84}_0 ∧ true) 
c  in CNF:
c    -b^{5, 84}_2 ∨  b^{5, 84}_1 ∨  b^{5, 84}_0 ∨ false 
c  in DIMACS:
-8678  8679  8680  0

c  3 does not represent an automaton state.
c    -(-b^{5, 84}_2 ∧  b^{5, 84}_1 ∧  b^{5, 84}_0 ∧ true) 
c  in CNF:
c     b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ false 
c  in DIMACS:
 8678 -8679 -8680  0
c  -3 does not represent an automaton state.
c    -( b^{5, 84}_2 ∧  b^{5, 84}_1 ∧  b^{5, 84}_0 ∧ true) 
c  in CNF:
c    -b^{5, 84}_2 ∨ -b^{5, 84}_1 ∨ -b^{5, 84}_0 ∨ false 
c  in DIMACS:
-8678 -8679 -8680  0

c i = 85
c  -2+1 --> -1
c    ( b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧  p_425) -> ( b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0)
c  in CNF:
c    -b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨  b^{5, 86}_2
c    -b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_1
c    -b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨  b^{5, 86}_0
c  in DIMACS:
-8681 -8682  8683 -425  8684 0
-8681 -8682  8683 -425 -8685 0
-8681 -8682  8683 -425  8686 0

c  -1+1 --> 0
c    ( b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0 ∧  p_425) -> (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧ -b^{5, 86}_0)
c  in CNF:
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_2
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_1
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_0
c  in DIMACS:
-8681  8682 -8683 -425 -8684 0
-8681  8682 -8683 -425 -8685 0
-8681  8682 -8683 -425 -8686 0

c  0+1 --> 1
c    (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧  p_425) -> (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0)
c  in CNF:
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_2
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_1
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨  b^{5, 86}_0
c  in DIMACS:
 8681  8682  8683 -425 -8684 0
 8681  8682  8683 -425 -8685 0
 8681  8682  8683 -425  8686 0

c  1+1 --> 2
c    (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0 ∧  p_425) -> (-b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0)
c  in CNF:
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_2
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨  b^{5, 86}_1
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ -p_425 ∨ -b^{5, 86}_0
c  in DIMACS:
 8681  8682 -8683 -425 -8684 0
 8681  8682 -8683 -425  8685 0
 8681  8682 -8683 -425 -8686 0

c  2+1 --> break 
c    (-b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧  p_425) -> break
c  in CNF:
c     b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ -p_425 ∨ break
c  in DIMACS:
 8681 -8682  8683 -425 1162 0


c  2-1 --> 1
c    (-b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧ -p_425) -> (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0)
c  in CNF:
c     b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_2
c     b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_1
c     b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨  b^{5, 86}_0
c  in DIMACS:
 8681 -8682  8683  425 -8684 0
 8681 -8682  8683  425 -8685 0
 8681 -8682  8683  425  8686 0

c  1-1 --> 0
c    (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0 ∧ -p_425) -> (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧ -b^{5, 86}_0)
c  in CNF:
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_2
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_1
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_0
c  in DIMACS:
 8681  8682 -8683  425 -8684 0
 8681  8682 -8683  425 -8685 0
 8681  8682 -8683  425 -8686 0

c  0-1 --> -1
c    (-b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧ -p_425) -> ( b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0)
c  in CNF:
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨  b^{5, 86}_2
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_1
c     b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨  b^{5, 86}_0
c  in DIMACS:
 8681  8682  8683  425  8684 0
 8681  8682  8683  425 -8685 0
 8681  8682  8683  425  8686 0

c  -1-1 --> -2
c    ( b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧  b^{5, 85}_0 ∧ -p_425) -> ( b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0)
c  in CNF:
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨  b^{5, 86}_2
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨  b^{5, 86}_1
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨  p_425 ∨ -b^{5, 86}_0
c  in DIMACS:
-8681  8682 -8683  425  8684 0
-8681  8682 -8683  425  8685 0
-8681  8682 -8683  425 -8686 0

c  -2-1 --> break 
c    ( b^{5, 85}_2 ∧  b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧ -p_425) -> break
c  in CNF:
c    -b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨  b^{5, 85}_0 ∨  p_425 ∨ break
c  in DIMACS:
-8681 -8682  8683  425 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 85}_2 ∧ -b^{5, 85}_1 ∧ -b^{5, 85}_0 ∧ true) 
c  in CNF:
c    -b^{5, 85}_2 ∨  b^{5, 85}_1 ∨  b^{5, 85}_0 ∨ false 
c  in DIMACS:
-8681  8682  8683  0

c  3 does not represent an automaton state.
c    -(-b^{5, 85}_2 ∧  b^{5, 85}_1 ∧  b^{5, 85}_0 ∧ true) 
c  in CNF:
c     b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ false 
c  in DIMACS:
 8681 -8682 -8683  0
c  -3 does not represent an automaton state.
c    -( b^{5, 85}_2 ∧  b^{5, 85}_1 ∧  b^{5, 85}_0 ∧ true) 
c  in CNF:
c    -b^{5, 85}_2 ∨ -b^{5, 85}_1 ∨ -b^{5, 85}_0 ∨ false 
c  in DIMACS:
-8681 -8682 -8683  0

c i = 86
c  -2+1 --> -1
c    ( b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧  p_430) -> ( b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0)
c  in CNF:
c    -b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨  b^{5, 87}_2
c    -b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_1
c    -b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨  b^{5, 87}_0
c  in DIMACS:
-8684 -8685  8686 -430  8687 0
-8684 -8685  8686 -430 -8688 0
-8684 -8685  8686 -430  8689 0

c  -1+1 --> 0
c    ( b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0 ∧  p_430) -> (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧ -b^{5, 87}_0)
c  in CNF:
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_2
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_1
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_0
c  in DIMACS:
-8684  8685 -8686 -430 -8687 0
-8684  8685 -8686 -430 -8688 0
-8684  8685 -8686 -430 -8689 0

c  0+1 --> 1
c    (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧  p_430) -> (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0)
c  in CNF:
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_2
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_1
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨  b^{5, 87}_0
c  in DIMACS:
 8684  8685  8686 -430 -8687 0
 8684  8685  8686 -430 -8688 0
 8684  8685  8686 -430  8689 0

c  1+1 --> 2
c    (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0 ∧  p_430) -> (-b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0)
c  in CNF:
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_2
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨  b^{5, 87}_1
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ -p_430 ∨ -b^{5, 87}_0
c  in DIMACS:
 8684  8685 -8686 -430 -8687 0
 8684  8685 -8686 -430  8688 0
 8684  8685 -8686 -430 -8689 0

c  2+1 --> break 
c    (-b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧  p_430) -> break
c  in CNF:
c     b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 8684 -8685  8686 -430 1162 0


c  2-1 --> 1
c    (-b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧ -p_430) -> (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0)
c  in CNF:
c     b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_2
c     b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_1
c     b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨  b^{5, 87}_0
c  in DIMACS:
 8684 -8685  8686  430 -8687 0
 8684 -8685  8686  430 -8688 0
 8684 -8685  8686  430  8689 0

c  1-1 --> 0
c    (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0 ∧ -p_430) -> (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧ -b^{5, 87}_0)
c  in CNF:
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_2
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_1
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_0
c  in DIMACS:
 8684  8685 -8686  430 -8687 0
 8684  8685 -8686  430 -8688 0
 8684  8685 -8686  430 -8689 0

c  0-1 --> -1
c    (-b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧ -p_430) -> ( b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0)
c  in CNF:
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨  b^{5, 87}_2
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_1
c     b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨  b^{5, 87}_0
c  in DIMACS:
 8684  8685  8686  430  8687 0
 8684  8685  8686  430 -8688 0
 8684  8685  8686  430  8689 0

c  -1-1 --> -2
c    ( b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧  b^{5, 86}_0 ∧ -p_430) -> ( b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0)
c  in CNF:
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨  b^{5, 87}_2
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨  b^{5, 87}_1
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨  p_430 ∨ -b^{5, 87}_0
c  in DIMACS:
-8684  8685 -8686  430  8687 0
-8684  8685 -8686  430  8688 0
-8684  8685 -8686  430 -8689 0

c  -2-1 --> break 
c    ( b^{5, 86}_2 ∧  b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨  b^{5, 86}_0 ∨  p_430 ∨ break
c  in DIMACS:
-8684 -8685  8686  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 86}_2 ∧ -b^{5, 86}_1 ∧ -b^{5, 86}_0 ∧ true) 
c  in CNF:
c    -b^{5, 86}_2 ∨  b^{5, 86}_1 ∨  b^{5, 86}_0 ∨ false 
c  in DIMACS:
-8684  8685  8686  0

c  3 does not represent an automaton state.
c    -(-b^{5, 86}_2 ∧  b^{5, 86}_1 ∧  b^{5, 86}_0 ∧ true) 
c  in CNF:
c     b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ false 
c  in DIMACS:
 8684 -8685 -8686  0
c  -3 does not represent an automaton state.
c    -( b^{5, 86}_2 ∧  b^{5, 86}_1 ∧  b^{5, 86}_0 ∧ true) 
c  in CNF:
c    -b^{5, 86}_2 ∨ -b^{5, 86}_1 ∨ -b^{5, 86}_0 ∨ false 
c  in DIMACS:
-8684 -8685 -8686  0

c i = 87
c  -2+1 --> -1
c    ( b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧  p_435) -> ( b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0)
c  in CNF:
c    -b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨  b^{5, 88}_2
c    -b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_1
c    -b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨  b^{5, 88}_0
c  in DIMACS:
-8687 -8688  8689 -435  8690 0
-8687 -8688  8689 -435 -8691 0
-8687 -8688  8689 -435  8692 0

c  -1+1 --> 0
c    ( b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0 ∧  p_435) -> (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧ -b^{5, 88}_0)
c  in CNF:
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_2
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_1
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_0
c  in DIMACS:
-8687  8688 -8689 -435 -8690 0
-8687  8688 -8689 -435 -8691 0
-8687  8688 -8689 -435 -8692 0

c  0+1 --> 1
c    (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧  p_435) -> (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0)
c  in CNF:
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_2
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_1
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨  b^{5, 88}_0
c  in DIMACS:
 8687  8688  8689 -435 -8690 0
 8687  8688  8689 -435 -8691 0
 8687  8688  8689 -435  8692 0

c  1+1 --> 2
c    (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0 ∧  p_435) -> (-b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0)
c  in CNF:
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_2
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨  b^{5, 88}_1
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ -p_435 ∨ -b^{5, 88}_0
c  in DIMACS:
 8687  8688 -8689 -435 -8690 0
 8687  8688 -8689 -435  8691 0
 8687  8688 -8689 -435 -8692 0

c  2+1 --> break 
c    (-b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧  p_435) -> break
c  in CNF:
c     b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 8687 -8688  8689 -435 1162 0


c  2-1 --> 1
c    (-b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧ -p_435) -> (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0)
c  in CNF:
c     b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_2
c     b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_1
c     b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨  b^{5, 88}_0
c  in DIMACS:
 8687 -8688  8689  435 -8690 0
 8687 -8688  8689  435 -8691 0
 8687 -8688  8689  435  8692 0

c  1-1 --> 0
c    (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0 ∧ -p_435) -> (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧ -b^{5, 88}_0)
c  in CNF:
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_2
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_1
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_0
c  in DIMACS:
 8687  8688 -8689  435 -8690 0
 8687  8688 -8689  435 -8691 0
 8687  8688 -8689  435 -8692 0

c  0-1 --> -1
c    (-b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧ -p_435) -> ( b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0)
c  in CNF:
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨  b^{5, 88}_2
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_1
c     b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨  b^{5, 88}_0
c  in DIMACS:
 8687  8688  8689  435  8690 0
 8687  8688  8689  435 -8691 0
 8687  8688  8689  435  8692 0

c  -1-1 --> -2
c    ( b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧  b^{5, 87}_0 ∧ -p_435) -> ( b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0)
c  in CNF:
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨  b^{5, 88}_2
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨  b^{5, 88}_1
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨  p_435 ∨ -b^{5, 88}_0
c  in DIMACS:
-8687  8688 -8689  435  8690 0
-8687  8688 -8689  435  8691 0
-8687  8688 -8689  435 -8692 0

c  -2-1 --> break 
c    ( b^{5, 87}_2 ∧  b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨  b^{5, 87}_0 ∨  p_435 ∨ break
c  in DIMACS:
-8687 -8688  8689  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 87}_2 ∧ -b^{5, 87}_1 ∧ -b^{5, 87}_0 ∧ true) 
c  in CNF:
c    -b^{5, 87}_2 ∨  b^{5, 87}_1 ∨  b^{5, 87}_0 ∨ false 
c  in DIMACS:
-8687  8688  8689  0

c  3 does not represent an automaton state.
c    -(-b^{5, 87}_2 ∧  b^{5, 87}_1 ∧  b^{5, 87}_0 ∧ true) 
c  in CNF:
c     b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ false 
c  in DIMACS:
 8687 -8688 -8689  0
c  -3 does not represent an automaton state.
c    -( b^{5, 87}_2 ∧  b^{5, 87}_1 ∧  b^{5, 87}_0 ∧ true) 
c  in CNF:
c    -b^{5, 87}_2 ∨ -b^{5, 87}_1 ∨ -b^{5, 87}_0 ∨ false 
c  in DIMACS:
-8687 -8688 -8689  0

c i = 88
c  -2+1 --> -1
c    ( b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧  p_440) -> ( b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0)
c  in CNF:
c    -b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨  b^{5, 89}_2
c    -b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_1
c    -b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨  b^{5, 89}_0
c  in DIMACS:
-8690 -8691  8692 -440  8693 0
-8690 -8691  8692 -440 -8694 0
-8690 -8691  8692 -440  8695 0

c  -1+1 --> 0
c    ( b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0 ∧  p_440) -> (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧ -b^{5, 89}_0)
c  in CNF:
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_2
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_1
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_0
c  in DIMACS:
-8690  8691 -8692 -440 -8693 0
-8690  8691 -8692 -440 -8694 0
-8690  8691 -8692 -440 -8695 0

c  0+1 --> 1
c    (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧  p_440) -> (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0)
c  in CNF:
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_2
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_1
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨  b^{5, 89}_0
c  in DIMACS:
 8690  8691  8692 -440 -8693 0
 8690  8691  8692 -440 -8694 0
 8690  8691  8692 -440  8695 0

c  1+1 --> 2
c    (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0 ∧  p_440) -> (-b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0)
c  in CNF:
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_2
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨  b^{5, 89}_1
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ -p_440 ∨ -b^{5, 89}_0
c  in DIMACS:
 8690  8691 -8692 -440 -8693 0
 8690  8691 -8692 -440  8694 0
 8690  8691 -8692 -440 -8695 0

c  2+1 --> break 
c    (-b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧  p_440) -> break
c  in CNF:
c     b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 8690 -8691  8692 -440 1162 0


c  2-1 --> 1
c    (-b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧ -p_440) -> (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0)
c  in CNF:
c     b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_2
c     b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_1
c     b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨  b^{5, 89}_0
c  in DIMACS:
 8690 -8691  8692  440 -8693 0
 8690 -8691  8692  440 -8694 0
 8690 -8691  8692  440  8695 0

c  1-1 --> 0
c    (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0 ∧ -p_440) -> (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧ -b^{5, 89}_0)
c  in CNF:
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_2
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_1
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_0
c  in DIMACS:
 8690  8691 -8692  440 -8693 0
 8690  8691 -8692  440 -8694 0
 8690  8691 -8692  440 -8695 0

c  0-1 --> -1
c    (-b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧ -p_440) -> ( b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0)
c  in CNF:
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨  b^{5, 89}_2
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_1
c     b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨  b^{5, 89}_0
c  in DIMACS:
 8690  8691  8692  440  8693 0
 8690  8691  8692  440 -8694 0
 8690  8691  8692  440  8695 0

c  -1-1 --> -2
c    ( b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧  b^{5, 88}_0 ∧ -p_440) -> ( b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0)
c  in CNF:
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨  b^{5, 89}_2
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨  b^{5, 89}_1
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨  p_440 ∨ -b^{5, 89}_0
c  in DIMACS:
-8690  8691 -8692  440  8693 0
-8690  8691 -8692  440  8694 0
-8690  8691 -8692  440 -8695 0

c  -2-1 --> break 
c    ( b^{5, 88}_2 ∧  b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨  b^{5, 88}_0 ∨  p_440 ∨ break
c  in DIMACS:
-8690 -8691  8692  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 88}_2 ∧ -b^{5, 88}_1 ∧ -b^{5, 88}_0 ∧ true) 
c  in CNF:
c    -b^{5, 88}_2 ∨  b^{5, 88}_1 ∨  b^{5, 88}_0 ∨ false 
c  in DIMACS:
-8690  8691  8692  0

c  3 does not represent an automaton state.
c    -(-b^{5, 88}_2 ∧  b^{5, 88}_1 ∧  b^{5, 88}_0 ∧ true) 
c  in CNF:
c     b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ false 
c  in DIMACS:
 8690 -8691 -8692  0
c  -3 does not represent an automaton state.
c    -( b^{5, 88}_2 ∧  b^{5, 88}_1 ∧  b^{5, 88}_0 ∧ true) 
c  in CNF:
c    -b^{5, 88}_2 ∨ -b^{5, 88}_1 ∨ -b^{5, 88}_0 ∨ false 
c  in DIMACS:
-8690 -8691 -8692  0

c i = 89
c  -2+1 --> -1
c    ( b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧  p_445) -> ( b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0)
c  in CNF:
c    -b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨  b^{5, 90}_2
c    -b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_1
c    -b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨  b^{5, 90}_0
c  in DIMACS:
-8693 -8694  8695 -445  8696 0
-8693 -8694  8695 -445 -8697 0
-8693 -8694  8695 -445  8698 0

c  -1+1 --> 0
c    ( b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0 ∧  p_445) -> (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧ -b^{5, 90}_0)
c  in CNF:
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_2
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_1
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_0
c  in DIMACS:
-8693  8694 -8695 -445 -8696 0
-8693  8694 -8695 -445 -8697 0
-8693  8694 -8695 -445 -8698 0

c  0+1 --> 1
c    (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧  p_445) -> (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0)
c  in CNF:
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_2
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_1
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨  b^{5, 90}_0
c  in DIMACS:
 8693  8694  8695 -445 -8696 0
 8693  8694  8695 -445 -8697 0
 8693  8694  8695 -445  8698 0

c  1+1 --> 2
c    (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0 ∧  p_445) -> (-b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0)
c  in CNF:
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_2
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨  b^{5, 90}_1
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ -p_445 ∨ -b^{5, 90}_0
c  in DIMACS:
 8693  8694 -8695 -445 -8696 0
 8693  8694 -8695 -445  8697 0
 8693  8694 -8695 -445 -8698 0

c  2+1 --> break 
c    (-b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧  p_445) -> break
c  in CNF:
c     b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ -p_445 ∨ break
c  in DIMACS:
 8693 -8694  8695 -445 1162 0


c  2-1 --> 1
c    (-b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧ -p_445) -> (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0)
c  in CNF:
c     b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_2
c     b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_1
c     b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨  b^{5, 90}_0
c  in DIMACS:
 8693 -8694  8695  445 -8696 0
 8693 -8694  8695  445 -8697 0
 8693 -8694  8695  445  8698 0

c  1-1 --> 0
c    (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0 ∧ -p_445) -> (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧ -b^{5, 90}_0)
c  in CNF:
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_2
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_1
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_0
c  in DIMACS:
 8693  8694 -8695  445 -8696 0
 8693  8694 -8695  445 -8697 0
 8693  8694 -8695  445 -8698 0

c  0-1 --> -1
c    (-b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧ -p_445) -> ( b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0)
c  in CNF:
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨  b^{5, 90}_2
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_1
c     b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨  b^{5, 90}_0
c  in DIMACS:
 8693  8694  8695  445  8696 0
 8693  8694  8695  445 -8697 0
 8693  8694  8695  445  8698 0

c  -1-1 --> -2
c    ( b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧  b^{5, 89}_0 ∧ -p_445) -> ( b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0)
c  in CNF:
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨  b^{5, 90}_2
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨  b^{5, 90}_1
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨  p_445 ∨ -b^{5, 90}_0
c  in DIMACS:
-8693  8694 -8695  445  8696 0
-8693  8694 -8695  445  8697 0
-8693  8694 -8695  445 -8698 0

c  -2-1 --> break 
c    ( b^{5, 89}_2 ∧  b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧ -p_445) -> break
c  in CNF:
c    -b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨  b^{5, 89}_0 ∨  p_445 ∨ break
c  in DIMACS:
-8693 -8694  8695  445 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 89}_2 ∧ -b^{5, 89}_1 ∧ -b^{5, 89}_0 ∧ true) 
c  in CNF:
c    -b^{5, 89}_2 ∨  b^{5, 89}_1 ∨  b^{5, 89}_0 ∨ false 
c  in DIMACS:
-8693  8694  8695  0

c  3 does not represent an automaton state.
c    -(-b^{5, 89}_2 ∧  b^{5, 89}_1 ∧  b^{5, 89}_0 ∧ true) 
c  in CNF:
c     b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ false 
c  in DIMACS:
 8693 -8694 -8695  0
c  -3 does not represent an automaton state.
c    -( b^{5, 89}_2 ∧  b^{5, 89}_1 ∧  b^{5, 89}_0 ∧ true) 
c  in CNF:
c    -b^{5, 89}_2 ∨ -b^{5, 89}_1 ∨ -b^{5, 89}_0 ∨ false 
c  in DIMACS:
-8693 -8694 -8695  0

c i = 90
c  -2+1 --> -1
c    ( b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧  p_450) -> ( b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0)
c  in CNF:
c    -b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨  b^{5, 91}_2
c    -b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_1
c    -b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨  b^{5, 91}_0
c  in DIMACS:
-8696 -8697  8698 -450  8699 0
-8696 -8697  8698 -450 -8700 0
-8696 -8697  8698 -450  8701 0

c  -1+1 --> 0
c    ( b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0 ∧  p_450) -> (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧ -b^{5, 91}_0)
c  in CNF:
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_2
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_1
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_0
c  in DIMACS:
-8696  8697 -8698 -450 -8699 0
-8696  8697 -8698 -450 -8700 0
-8696  8697 -8698 -450 -8701 0

c  0+1 --> 1
c    (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧  p_450) -> (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0)
c  in CNF:
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_2
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_1
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨  b^{5, 91}_0
c  in DIMACS:
 8696  8697  8698 -450 -8699 0
 8696  8697  8698 -450 -8700 0
 8696  8697  8698 -450  8701 0

c  1+1 --> 2
c    (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0 ∧  p_450) -> (-b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0)
c  in CNF:
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_2
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨  b^{5, 91}_1
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ -p_450 ∨ -b^{5, 91}_0
c  in DIMACS:
 8696  8697 -8698 -450 -8699 0
 8696  8697 -8698 -450  8700 0
 8696  8697 -8698 -450 -8701 0

c  2+1 --> break 
c    (-b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧  p_450) -> break
c  in CNF:
c     b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 8696 -8697  8698 -450 1162 0


c  2-1 --> 1
c    (-b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧ -p_450) -> (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0)
c  in CNF:
c     b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_2
c     b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_1
c     b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨  b^{5, 91}_0
c  in DIMACS:
 8696 -8697  8698  450 -8699 0
 8696 -8697  8698  450 -8700 0
 8696 -8697  8698  450  8701 0

c  1-1 --> 0
c    (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0 ∧ -p_450) -> (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧ -b^{5, 91}_0)
c  in CNF:
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_2
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_1
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_0
c  in DIMACS:
 8696  8697 -8698  450 -8699 0
 8696  8697 -8698  450 -8700 0
 8696  8697 -8698  450 -8701 0

c  0-1 --> -1
c    (-b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧ -p_450) -> ( b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0)
c  in CNF:
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨  b^{5, 91}_2
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_1
c     b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨  b^{5, 91}_0
c  in DIMACS:
 8696  8697  8698  450  8699 0
 8696  8697  8698  450 -8700 0
 8696  8697  8698  450  8701 0

c  -1-1 --> -2
c    ( b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧  b^{5, 90}_0 ∧ -p_450) -> ( b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0)
c  in CNF:
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨  b^{5, 91}_2
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨  b^{5, 91}_1
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨  p_450 ∨ -b^{5, 91}_0
c  in DIMACS:
-8696  8697 -8698  450  8699 0
-8696  8697 -8698  450  8700 0
-8696  8697 -8698  450 -8701 0

c  -2-1 --> break 
c    ( b^{5, 90}_2 ∧  b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨  b^{5, 90}_0 ∨  p_450 ∨ break
c  in DIMACS:
-8696 -8697  8698  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 90}_2 ∧ -b^{5, 90}_1 ∧ -b^{5, 90}_0 ∧ true) 
c  in CNF:
c    -b^{5, 90}_2 ∨  b^{5, 90}_1 ∨  b^{5, 90}_0 ∨ false 
c  in DIMACS:
-8696  8697  8698  0

c  3 does not represent an automaton state.
c    -(-b^{5, 90}_2 ∧  b^{5, 90}_1 ∧  b^{5, 90}_0 ∧ true) 
c  in CNF:
c     b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ false 
c  in DIMACS:
 8696 -8697 -8698  0
c  -3 does not represent an automaton state.
c    -( b^{5, 90}_2 ∧  b^{5, 90}_1 ∧  b^{5, 90}_0 ∧ true) 
c  in CNF:
c    -b^{5, 90}_2 ∨ -b^{5, 90}_1 ∨ -b^{5, 90}_0 ∨ false 
c  in DIMACS:
-8696 -8697 -8698  0

c i = 91
c  -2+1 --> -1
c    ( b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧  p_455) -> ( b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0)
c  in CNF:
c    -b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨  b^{5, 92}_2
c    -b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_1
c    -b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨  b^{5, 92}_0
c  in DIMACS:
-8699 -8700  8701 -455  8702 0
-8699 -8700  8701 -455 -8703 0
-8699 -8700  8701 -455  8704 0

c  -1+1 --> 0
c    ( b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0 ∧  p_455) -> (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧ -b^{5, 92}_0)
c  in CNF:
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_2
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_1
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_0
c  in DIMACS:
-8699  8700 -8701 -455 -8702 0
-8699  8700 -8701 -455 -8703 0
-8699  8700 -8701 -455 -8704 0

c  0+1 --> 1
c    (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧  p_455) -> (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0)
c  in CNF:
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_2
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_1
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨  b^{5, 92}_0
c  in DIMACS:
 8699  8700  8701 -455 -8702 0
 8699  8700  8701 -455 -8703 0
 8699  8700  8701 -455  8704 0

c  1+1 --> 2
c    (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0 ∧  p_455) -> (-b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0)
c  in CNF:
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_2
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨  b^{5, 92}_1
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ -p_455 ∨ -b^{5, 92}_0
c  in DIMACS:
 8699  8700 -8701 -455 -8702 0
 8699  8700 -8701 -455  8703 0
 8699  8700 -8701 -455 -8704 0

c  2+1 --> break 
c    (-b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧  p_455) -> break
c  in CNF:
c     b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 8699 -8700  8701 -455 1162 0


c  2-1 --> 1
c    (-b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧ -p_455) -> (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0)
c  in CNF:
c     b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_2
c     b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_1
c     b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨  b^{5, 92}_0
c  in DIMACS:
 8699 -8700  8701  455 -8702 0
 8699 -8700  8701  455 -8703 0
 8699 -8700  8701  455  8704 0

c  1-1 --> 0
c    (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0 ∧ -p_455) -> (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧ -b^{5, 92}_0)
c  in CNF:
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_2
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_1
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_0
c  in DIMACS:
 8699  8700 -8701  455 -8702 0
 8699  8700 -8701  455 -8703 0
 8699  8700 -8701  455 -8704 0

c  0-1 --> -1
c    (-b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧ -p_455) -> ( b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0)
c  in CNF:
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨  b^{5, 92}_2
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_1
c     b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨  b^{5, 92}_0
c  in DIMACS:
 8699  8700  8701  455  8702 0
 8699  8700  8701  455 -8703 0
 8699  8700  8701  455  8704 0

c  -1-1 --> -2
c    ( b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧  b^{5, 91}_0 ∧ -p_455) -> ( b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0)
c  in CNF:
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨  b^{5, 92}_2
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨  b^{5, 92}_1
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨  p_455 ∨ -b^{5, 92}_0
c  in DIMACS:
-8699  8700 -8701  455  8702 0
-8699  8700 -8701  455  8703 0
-8699  8700 -8701  455 -8704 0

c  -2-1 --> break 
c    ( b^{5, 91}_2 ∧  b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨  b^{5, 91}_0 ∨  p_455 ∨ break
c  in DIMACS:
-8699 -8700  8701  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 91}_2 ∧ -b^{5, 91}_1 ∧ -b^{5, 91}_0 ∧ true) 
c  in CNF:
c    -b^{5, 91}_2 ∨  b^{5, 91}_1 ∨  b^{5, 91}_0 ∨ false 
c  in DIMACS:
-8699  8700  8701  0

c  3 does not represent an automaton state.
c    -(-b^{5, 91}_2 ∧  b^{5, 91}_1 ∧  b^{5, 91}_0 ∧ true) 
c  in CNF:
c     b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ false 
c  in DIMACS:
 8699 -8700 -8701  0
c  -3 does not represent an automaton state.
c    -( b^{5, 91}_2 ∧  b^{5, 91}_1 ∧  b^{5, 91}_0 ∧ true) 
c  in CNF:
c    -b^{5, 91}_2 ∨ -b^{5, 91}_1 ∨ -b^{5, 91}_0 ∨ false 
c  in DIMACS:
-8699 -8700 -8701  0

c i = 92
c  -2+1 --> -1
c    ( b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧  p_460) -> ( b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0)
c  in CNF:
c    -b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨  b^{5, 93}_2
c    -b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_1
c    -b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨  b^{5, 93}_0
c  in DIMACS:
-8702 -8703  8704 -460  8705 0
-8702 -8703  8704 -460 -8706 0
-8702 -8703  8704 -460  8707 0

c  -1+1 --> 0
c    ( b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0 ∧  p_460) -> (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧ -b^{5, 93}_0)
c  in CNF:
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_2
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_1
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_0
c  in DIMACS:
-8702  8703 -8704 -460 -8705 0
-8702  8703 -8704 -460 -8706 0
-8702  8703 -8704 -460 -8707 0

c  0+1 --> 1
c    (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧  p_460) -> (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0)
c  in CNF:
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_2
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_1
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨  b^{5, 93}_0
c  in DIMACS:
 8702  8703  8704 -460 -8705 0
 8702  8703  8704 -460 -8706 0
 8702  8703  8704 -460  8707 0

c  1+1 --> 2
c    (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0 ∧  p_460) -> (-b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0)
c  in CNF:
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_2
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨  b^{5, 93}_1
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ -p_460 ∨ -b^{5, 93}_0
c  in DIMACS:
 8702  8703 -8704 -460 -8705 0
 8702  8703 -8704 -460  8706 0
 8702  8703 -8704 -460 -8707 0

c  2+1 --> break 
c    (-b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧  p_460) -> break
c  in CNF:
c     b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 8702 -8703  8704 -460 1162 0


c  2-1 --> 1
c    (-b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧ -p_460) -> (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0)
c  in CNF:
c     b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_2
c     b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_1
c     b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨  b^{5, 93}_0
c  in DIMACS:
 8702 -8703  8704  460 -8705 0
 8702 -8703  8704  460 -8706 0
 8702 -8703  8704  460  8707 0

c  1-1 --> 0
c    (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0 ∧ -p_460) -> (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧ -b^{5, 93}_0)
c  in CNF:
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_2
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_1
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_0
c  in DIMACS:
 8702  8703 -8704  460 -8705 0
 8702  8703 -8704  460 -8706 0
 8702  8703 -8704  460 -8707 0

c  0-1 --> -1
c    (-b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧ -p_460) -> ( b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0)
c  in CNF:
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨  b^{5, 93}_2
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_1
c     b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨  b^{5, 93}_0
c  in DIMACS:
 8702  8703  8704  460  8705 0
 8702  8703  8704  460 -8706 0
 8702  8703  8704  460  8707 0

c  -1-1 --> -2
c    ( b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧  b^{5, 92}_0 ∧ -p_460) -> ( b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0)
c  in CNF:
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨  b^{5, 93}_2
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨  b^{5, 93}_1
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨  p_460 ∨ -b^{5, 93}_0
c  in DIMACS:
-8702  8703 -8704  460  8705 0
-8702  8703 -8704  460  8706 0
-8702  8703 -8704  460 -8707 0

c  -2-1 --> break 
c    ( b^{5, 92}_2 ∧  b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨  b^{5, 92}_0 ∨  p_460 ∨ break
c  in DIMACS:
-8702 -8703  8704  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 92}_2 ∧ -b^{5, 92}_1 ∧ -b^{5, 92}_0 ∧ true) 
c  in CNF:
c    -b^{5, 92}_2 ∨  b^{5, 92}_1 ∨  b^{5, 92}_0 ∨ false 
c  in DIMACS:
-8702  8703  8704  0

c  3 does not represent an automaton state.
c    -(-b^{5, 92}_2 ∧  b^{5, 92}_1 ∧  b^{5, 92}_0 ∧ true) 
c  in CNF:
c     b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ false 
c  in DIMACS:
 8702 -8703 -8704  0
c  -3 does not represent an automaton state.
c    -( b^{5, 92}_2 ∧  b^{5, 92}_1 ∧  b^{5, 92}_0 ∧ true) 
c  in CNF:
c    -b^{5, 92}_2 ∨ -b^{5, 92}_1 ∨ -b^{5, 92}_0 ∨ false 
c  in DIMACS:
-8702 -8703 -8704  0

c i = 93
c  -2+1 --> -1
c    ( b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧  p_465) -> ( b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0)
c  in CNF:
c    -b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨  b^{5, 94}_2
c    -b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_1
c    -b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨  b^{5, 94}_0
c  in DIMACS:
-8705 -8706  8707 -465  8708 0
-8705 -8706  8707 -465 -8709 0
-8705 -8706  8707 -465  8710 0

c  -1+1 --> 0
c    ( b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0 ∧  p_465) -> (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧ -b^{5, 94}_0)
c  in CNF:
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_2
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_1
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_0
c  in DIMACS:
-8705  8706 -8707 -465 -8708 0
-8705  8706 -8707 -465 -8709 0
-8705  8706 -8707 -465 -8710 0

c  0+1 --> 1
c    (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧  p_465) -> (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0)
c  in CNF:
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_2
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_1
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨  b^{5, 94}_0
c  in DIMACS:
 8705  8706  8707 -465 -8708 0
 8705  8706  8707 -465 -8709 0
 8705  8706  8707 -465  8710 0

c  1+1 --> 2
c    (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0 ∧  p_465) -> (-b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0)
c  in CNF:
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_2
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨  b^{5, 94}_1
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ -p_465 ∨ -b^{5, 94}_0
c  in DIMACS:
 8705  8706 -8707 -465 -8708 0
 8705  8706 -8707 -465  8709 0
 8705  8706 -8707 -465 -8710 0

c  2+1 --> break 
c    (-b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧  p_465) -> break
c  in CNF:
c     b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 8705 -8706  8707 -465 1162 0


c  2-1 --> 1
c    (-b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧ -p_465) -> (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0)
c  in CNF:
c     b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_2
c     b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_1
c     b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨  b^{5, 94}_0
c  in DIMACS:
 8705 -8706  8707  465 -8708 0
 8705 -8706  8707  465 -8709 0
 8705 -8706  8707  465  8710 0

c  1-1 --> 0
c    (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0 ∧ -p_465) -> (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧ -b^{5, 94}_0)
c  in CNF:
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_2
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_1
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_0
c  in DIMACS:
 8705  8706 -8707  465 -8708 0
 8705  8706 -8707  465 -8709 0
 8705  8706 -8707  465 -8710 0

c  0-1 --> -1
c    (-b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧ -p_465) -> ( b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0)
c  in CNF:
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨  b^{5, 94}_2
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_1
c     b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨  b^{5, 94}_0
c  in DIMACS:
 8705  8706  8707  465  8708 0
 8705  8706  8707  465 -8709 0
 8705  8706  8707  465  8710 0

c  -1-1 --> -2
c    ( b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧  b^{5, 93}_0 ∧ -p_465) -> ( b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0)
c  in CNF:
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨  b^{5, 94}_2
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨  b^{5, 94}_1
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨  p_465 ∨ -b^{5, 94}_0
c  in DIMACS:
-8705  8706 -8707  465  8708 0
-8705  8706 -8707  465  8709 0
-8705  8706 -8707  465 -8710 0

c  -2-1 --> break 
c    ( b^{5, 93}_2 ∧  b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨  b^{5, 93}_0 ∨  p_465 ∨ break
c  in DIMACS:
-8705 -8706  8707  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 93}_2 ∧ -b^{5, 93}_1 ∧ -b^{5, 93}_0 ∧ true) 
c  in CNF:
c    -b^{5, 93}_2 ∨  b^{5, 93}_1 ∨  b^{5, 93}_0 ∨ false 
c  in DIMACS:
-8705  8706  8707  0

c  3 does not represent an automaton state.
c    -(-b^{5, 93}_2 ∧  b^{5, 93}_1 ∧  b^{5, 93}_0 ∧ true) 
c  in CNF:
c     b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ false 
c  in DIMACS:
 8705 -8706 -8707  0
c  -3 does not represent an automaton state.
c    -( b^{5, 93}_2 ∧  b^{5, 93}_1 ∧  b^{5, 93}_0 ∧ true) 
c  in CNF:
c    -b^{5, 93}_2 ∨ -b^{5, 93}_1 ∨ -b^{5, 93}_0 ∨ false 
c  in DIMACS:
-8705 -8706 -8707  0

c i = 94
c  -2+1 --> -1
c    ( b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧  p_470) -> ( b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0)
c  in CNF:
c    -b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨  b^{5, 95}_2
c    -b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_1
c    -b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨  b^{5, 95}_0
c  in DIMACS:
-8708 -8709  8710 -470  8711 0
-8708 -8709  8710 -470 -8712 0
-8708 -8709  8710 -470  8713 0

c  -1+1 --> 0
c    ( b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0 ∧  p_470) -> (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧ -b^{5, 95}_0)
c  in CNF:
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_2
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_1
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_0
c  in DIMACS:
-8708  8709 -8710 -470 -8711 0
-8708  8709 -8710 -470 -8712 0
-8708  8709 -8710 -470 -8713 0

c  0+1 --> 1
c    (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧  p_470) -> (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0)
c  in CNF:
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_2
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_1
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨  b^{5, 95}_0
c  in DIMACS:
 8708  8709  8710 -470 -8711 0
 8708  8709  8710 -470 -8712 0
 8708  8709  8710 -470  8713 0

c  1+1 --> 2
c    (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0 ∧  p_470) -> (-b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0)
c  in CNF:
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_2
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨  b^{5, 95}_1
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ -p_470 ∨ -b^{5, 95}_0
c  in DIMACS:
 8708  8709 -8710 -470 -8711 0
 8708  8709 -8710 -470  8712 0
 8708  8709 -8710 -470 -8713 0

c  2+1 --> break 
c    (-b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧  p_470) -> break
c  in CNF:
c     b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 8708 -8709  8710 -470 1162 0


c  2-1 --> 1
c    (-b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧ -p_470) -> (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0)
c  in CNF:
c     b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_2
c     b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_1
c     b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨  b^{5, 95}_0
c  in DIMACS:
 8708 -8709  8710  470 -8711 0
 8708 -8709  8710  470 -8712 0
 8708 -8709  8710  470  8713 0

c  1-1 --> 0
c    (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0 ∧ -p_470) -> (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧ -b^{5, 95}_0)
c  in CNF:
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_2
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_1
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_0
c  in DIMACS:
 8708  8709 -8710  470 -8711 0
 8708  8709 -8710  470 -8712 0
 8708  8709 -8710  470 -8713 0

c  0-1 --> -1
c    (-b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧ -p_470) -> ( b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0)
c  in CNF:
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨  b^{5, 95}_2
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_1
c     b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨  b^{5, 95}_0
c  in DIMACS:
 8708  8709  8710  470  8711 0
 8708  8709  8710  470 -8712 0
 8708  8709  8710  470  8713 0

c  -1-1 --> -2
c    ( b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧  b^{5, 94}_0 ∧ -p_470) -> ( b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0)
c  in CNF:
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨  b^{5, 95}_2
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨  b^{5, 95}_1
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨  p_470 ∨ -b^{5, 95}_0
c  in DIMACS:
-8708  8709 -8710  470  8711 0
-8708  8709 -8710  470  8712 0
-8708  8709 -8710  470 -8713 0

c  -2-1 --> break 
c    ( b^{5, 94}_2 ∧  b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨  b^{5, 94}_0 ∨  p_470 ∨ break
c  in DIMACS:
-8708 -8709  8710  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 94}_2 ∧ -b^{5, 94}_1 ∧ -b^{5, 94}_0 ∧ true) 
c  in CNF:
c    -b^{5, 94}_2 ∨  b^{5, 94}_1 ∨  b^{5, 94}_0 ∨ false 
c  in DIMACS:
-8708  8709  8710  0

c  3 does not represent an automaton state.
c    -(-b^{5, 94}_2 ∧  b^{5, 94}_1 ∧  b^{5, 94}_0 ∧ true) 
c  in CNF:
c     b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ false 
c  in DIMACS:
 8708 -8709 -8710  0
c  -3 does not represent an automaton state.
c    -( b^{5, 94}_2 ∧  b^{5, 94}_1 ∧  b^{5, 94}_0 ∧ true) 
c  in CNF:
c    -b^{5, 94}_2 ∨ -b^{5, 94}_1 ∨ -b^{5, 94}_0 ∨ false 
c  in DIMACS:
-8708 -8709 -8710  0

c i = 95
c  -2+1 --> -1
c    ( b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧  p_475) -> ( b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0)
c  in CNF:
c    -b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨  b^{5, 96}_2
c    -b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_1
c    -b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨  b^{5, 96}_0
c  in DIMACS:
-8711 -8712  8713 -475  8714 0
-8711 -8712  8713 -475 -8715 0
-8711 -8712  8713 -475  8716 0

c  -1+1 --> 0
c    ( b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0 ∧  p_475) -> (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧ -b^{5, 96}_0)
c  in CNF:
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_2
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_1
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_0
c  in DIMACS:
-8711  8712 -8713 -475 -8714 0
-8711  8712 -8713 -475 -8715 0
-8711  8712 -8713 -475 -8716 0

c  0+1 --> 1
c    (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧  p_475) -> (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0)
c  in CNF:
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_2
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_1
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨  b^{5, 96}_0
c  in DIMACS:
 8711  8712  8713 -475 -8714 0
 8711  8712  8713 -475 -8715 0
 8711  8712  8713 -475  8716 0

c  1+1 --> 2
c    (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0 ∧  p_475) -> (-b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0)
c  in CNF:
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_2
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨  b^{5, 96}_1
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ -p_475 ∨ -b^{5, 96}_0
c  in DIMACS:
 8711  8712 -8713 -475 -8714 0
 8711  8712 -8713 -475  8715 0
 8711  8712 -8713 -475 -8716 0

c  2+1 --> break 
c    (-b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧  p_475) -> break
c  in CNF:
c     b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ -p_475 ∨ break
c  in DIMACS:
 8711 -8712  8713 -475 1162 0


c  2-1 --> 1
c    (-b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧ -p_475) -> (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0)
c  in CNF:
c     b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_2
c     b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_1
c     b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨  b^{5, 96}_0
c  in DIMACS:
 8711 -8712  8713  475 -8714 0
 8711 -8712  8713  475 -8715 0
 8711 -8712  8713  475  8716 0

c  1-1 --> 0
c    (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0 ∧ -p_475) -> (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧ -b^{5, 96}_0)
c  in CNF:
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_2
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_1
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_0
c  in DIMACS:
 8711  8712 -8713  475 -8714 0
 8711  8712 -8713  475 -8715 0
 8711  8712 -8713  475 -8716 0

c  0-1 --> -1
c    (-b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧ -p_475) -> ( b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0)
c  in CNF:
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨  b^{5, 96}_2
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_1
c     b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨  b^{5, 96}_0
c  in DIMACS:
 8711  8712  8713  475  8714 0
 8711  8712  8713  475 -8715 0
 8711  8712  8713  475  8716 0

c  -1-1 --> -2
c    ( b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧  b^{5, 95}_0 ∧ -p_475) -> ( b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0)
c  in CNF:
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨  b^{5, 96}_2
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨  b^{5, 96}_1
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨  p_475 ∨ -b^{5, 96}_0
c  in DIMACS:
-8711  8712 -8713  475  8714 0
-8711  8712 -8713  475  8715 0
-8711  8712 -8713  475 -8716 0

c  -2-1 --> break 
c    ( b^{5, 95}_2 ∧  b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧ -p_475) -> break
c  in CNF:
c    -b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨  b^{5, 95}_0 ∨  p_475 ∨ break
c  in DIMACS:
-8711 -8712  8713  475 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 95}_2 ∧ -b^{5, 95}_1 ∧ -b^{5, 95}_0 ∧ true) 
c  in CNF:
c    -b^{5, 95}_2 ∨  b^{5, 95}_1 ∨  b^{5, 95}_0 ∨ false 
c  in DIMACS:
-8711  8712  8713  0

c  3 does not represent an automaton state.
c    -(-b^{5, 95}_2 ∧  b^{5, 95}_1 ∧  b^{5, 95}_0 ∧ true) 
c  in CNF:
c     b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ false 
c  in DIMACS:
 8711 -8712 -8713  0
c  -3 does not represent an automaton state.
c    -( b^{5, 95}_2 ∧  b^{5, 95}_1 ∧  b^{5, 95}_0 ∧ true) 
c  in CNF:
c    -b^{5, 95}_2 ∨ -b^{5, 95}_1 ∨ -b^{5, 95}_0 ∨ false 
c  in DIMACS:
-8711 -8712 -8713  0

c i = 96
c  -2+1 --> -1
c    ( b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧  p_480) -> ( b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0)
c  in CNF:
c    -b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨  b^{5, 97}_2
c    -b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_1
c    -b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨  b^{5, 97}_0
c  in DIMACS:
-8714 -8715  8716 -480  8717 0
-8714 -8715  8716 -480 -8718 0
-8714 -8715  8716 -480  8719 0

c  -1+1 --> 0
c    ( b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0 ∧  p_480) -> (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧ -b^{5, 97}_0)
c  in CNF:
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_2
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_1
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_0
c  in DIMACS:
-8714  8715 -8716 -480 -8717 0
-8714  8715 -8716 -480 -8718 0
-8714  8715 -8716 -480 -8719 0

c  0+1 --> 1
c    (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧  p_480) -> (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0)
c  in CNF:
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_2
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_1
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨  b^{5, 97}_0
c  in DIMACS:
 8714  8715  8716 -480 -8717 0
 8714  8715  8716 -480 -8718 0
 8714  8715  8716 -480  8719 0

c  1+1 --> 2
c    (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0 ∧  p_480) -> (-b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0)
c  in CNF:
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_2
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨  b^{5, 97}_1
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ -p_480 ∨ -b^{5, 97}_0
c  in DIMACS:
 8714  8715 -8716 -480 -8717 0
 8714  8715 -8716 -480  8718 0
 8714  8715 -8716 -480 -8719 0

c  2+1 --> break 
c    (-b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧  p_480) -> break
c  in CNF:
c     b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 8714 -8715  8716 -480 1162 0


c  2-1 --> 1
c    (-b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧ -p_480) -> (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0)
c  in CNF:
c     b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_2
c     b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_1
c     b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨  b^{5, 97}_0
c  in DIMACS:
 8714 -8715  8716  480 -8717 0
 8714 -8715  8716  480 -8718 0
 8714 -8715  8716  480  8719 0

c  1-1 --> 0
c    (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0 ∧ -p_480) -> (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧ -b^{5, 97}_0)
c  in CNF:
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_2
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_1
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_0
c  in DIMACS:
 8714  8715 -8716  480 -8717 0
 8714  8715 -8716  480 -8718 0
 8714  8715 -8716  480 -8719 0

c  0-1 --> -1
c    (-b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧ -p_480) -> ( b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0)
c  in CNF:
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨  b^{5, 97}_2
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_1
c     b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨  b^{5, 97}_0
c  in DIMACS:
 8714  8715  8716  480  8717 0
 8714  8715  8716  480 -8718 0
 8714  8715  8716  480  8719 0

c  -1-1 --> -2
c    ( b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧  b^{5, 96}_0 ∧ -p_480) -> ( b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0)
c  in CNF:
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨  b^{5, 97}_2
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨  b^{5, 97}_1
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨  p_480 ∨ -b^{5, 97}_0
c  in DIMACS:
-8714  8715 -8716  480  8717 0
-8714  8715 -8716  480  8718 0
-8714  8715 -8716  480 -8719 0

c  -2-1 --> break 
c    ( b^{5, 96}_2 ∧  b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨  b^{5, 96}_0 ∨  p_480 ∨ break
c  in DIMACS:
-8714 -8715  8716  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 96}_2 ∧ -b^{5, 96}_1 ∧ -b^{5, 96}_0 ∧ true) 
c  in CNF:
c    -b^{5, 96}_2 ∨  b^{5, 96}_1 ∨  b^{5, 96}_0 ∨ false 
c  in DIMACS:
-8714  8715  8716  0

c  3 does not represent an automaton state.
c    -(-b^{5, 96}_2 ∧  b^{5, 96}_1 ∧  b^{5, 96}_0 ∧ true) 
c  in CNF:
c     b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ false 
c  in DIMACS:
 8714 -8715 -8716  0
c  -3 does not represent an automaton state.
c    -( b^{5, 96}_2 ∧  b^{5, 96}_1 ∧  b^{5, 96}_0 ∧ true) 
c  in CNF:
c    -b^{5, 96}_2 ∨ -b^{5, 96}_1 ∨ -b^{5, 96}_0 ∨ false 
c  in DIMACS:
-8714 -8715 -8716  0

c i = 97
c  -2+1 --> -1
c    ( b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧  p_485) -> ( b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0)
c  in CNF:
c    -b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨  b^{5, 98}_2
c    -b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_1
c    -b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨  b^{5, 98}_0
c  in DIMACS:
-8717 -8718  8719 -485  8720 0
-8717 -8718  8719 -485 -8721 0
-8717 -8718  8719 -485  8722 0

c  -1+1 --> 0
c    ( b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0 ∧  p_485) -> (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧ -b^{5, 98}_0)
c  in CNF:
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_2
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_1
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_0
c  in DIMACS:
-8717  8718 -8719 -485 -8720 0
-8717  8718 -8719 -485 -8721 0
-8717  8718 -8719 -485 -8722 0

c  0+1 --> 1
c    (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧  p_485) -> (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0)
c  in CNF:
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_2
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_1
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨  b^{5, 98}_0
c  in DIMACS:
 8717  8718  8719 -485 -8720 0
 8717  8718  8719 -485 -8721 0
 8717  8718  8719 -485  8722 0

c  1+1 --> 2
c    (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0 ∧  p_485) -> (-b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0)
c  in CNF:
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_2
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨  b^{5, 98}_1
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ -p_485 ∨ -b^{5, 98}_0
c  in DIMACS:
 8717  8718 -8719 -485 -8720 0
 8717  8718 -8719 -485  8721 0
 8717  8718 -8719 -485 -8722 0

c  2+1 --> break 
c    (-b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧  p_485) -> break
c  in CNF:
c     b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ -p_485 ∨ break
c  in DIMACS:
 8717 -8718  8719 -485 1162 0


c  2-1 --> 1
c    (-b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧ -p_485) -> (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0)
c  in CNF:
c     b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_2
c     b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_1
c     b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨  b^{5, 98}_0
c  in DIMACS:
 8717 -8718  8719  485 -8720 0
 8717 -8718  8719  485 -8721 0
 8717 -8718  8719  485  8722 0

c  1-1 --> 0
c    (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0 ∧ -p_485) -> (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧ -b^{5, 98}_0)
c  in CNF:
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_2
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_1
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_0
c  in DIMACS:
 8717  8718 -8719  485 -8720 0
 8717  8718 -8719  485 -8721 0
 8717  8718 -8719  485 -8722 0

c  0-1 --> -1
c    (-b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧ -p_485) -> ( b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0)
c  in CNF:
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨  b^{5, 98}_2
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_1
c     b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨  b^{5, 98}_0
c  in DIMACS:
 8717  8718  8719  485  8720 0
 8717  8718  8719  485 -8721 0
 8717  8718  8719  485  8722 0

c  -1-1 --> -2
c    ( b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧  b^{5, 97}_0 ∧ -p_485) -> ( b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0)
c  in CNF:
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨  b^{5, 98}_2
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨  b^{5, 98}_1
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨  p_485 ∨ -b^{5, 98}_0
c  in DIMACS:
-8717  8718 -8719  485  8720 0
-8717  8718 -8719  485  8721 0
-8717  8718 -8719  485 -8722 0

c  -2-1 --> break 
c    ( b^{5, 97}_2 ∧  b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧ -p_485) -> break
c  in CNF:
c    -b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨  b^{5, 97}_0 ∨  p_485 ∨ break
c  in DIMACS:
-8717 -8718  8719  485 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 97}_2 ∧ -b^{5, 97}_1 ∧ -b^{5, 97}_0 ∧ true) 
c  in CNF:
c    -b^{5, 97}_2 ∨  b^{5, 97}_1 ∨  b^{5, 97}_0 ∨ false 
c  in DIMACS:
-8717  8718  8719  0

c  3 does not represent an automaton state.
c    -(-b^{5, 97}_2 ∧  b^{5, 97}_1 ∧  b^{5, 97}_0 ∧ true) 
c  in CNF:
c     b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ false 
c  in DIMACS:
 8717 -8718 -8719  0
c  -3 does not represent an automaton state.
c    -( b^{5, 97}_2 ∧  b^{5, 97}_1 ∧  b^{5, 97}_0 ∧ true) 
c  in CNF:
c    -b^{5, 97}_2 ∨ -b^{5, 97}_1 ∨ -b^{5, 97}_0 ∨ false 
c  in DIMACS:
-8717 -8718 -8719  0

c i = 98
c  -2+1 --> -1
c    ( b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧  p_490) -> ( b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0)
c  in CNF:
c    -b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨  b^{5, 99}_2
c    -b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_1
c    -b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨  b^{5, 99}_0
c  in DIMACS:
-8720 -8721  8722 -490  8723 0
-8720 -8721  8722 -490 -8724 0
-8720 -8721  8722 -490  8725 0

c  -1+1 --> 0
c    ( b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0 ∧  p_490) -> (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧ -b^{5, 99}_0)
c  in CNF:
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_2
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_1
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_0
c  in DIMACS:
-8720  8721 -8722 -490 -8723 0
-8720  8721 -8722 -490 -8724 0
-8720  8721 -8722 -490 -8725 0

c  0+1 --> 1
c    (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧  p_490) -> (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0)
c  in CNF:
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_2
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_1
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨  b^{5, 99}_0
c  in DIMACS:
 8720  8721  8722 -490 -8723 0
 8720  8721  8722 -490 -8724 0
 8720  8721  8722 -490  8725 0

c  1+1 --> 2
c    (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0 ∧  p_490) -> (-b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0)
c  in CNF:
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_2
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨  b^{5, 99}_1
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ -p_490 ∨ -b^{5, 99}_0
c  in DIMACS:
 8720  8721 -8722 -490 -8723 0
 8720  8721 -8722 -490  8724 0
 8720  8721 -8722 -490 -8725 0

c  2+1 --> break 
c    (-b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧  p_490) -> break
c  in CNF:
c     b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 8720 -8721  8722 -490 1162 0


c  2-1 --> 1
c    (-b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧ -p_490) -> (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0)
c  in CNF:
c     b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_2
c     b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_1
c     b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨  b^{5, 99}_0
c  in DIMACS:
 8720 -8721  8722  490 -8723 0
 8720 -8721  8722  490 -8724 0
 8720 -8721  8722  490  8725 0

c  1-1 --> 0
c    (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0 ∧ -p_490) -> (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧ -b^{5, 99}_0)
c  in CNF:
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_2
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_1
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_0
c  in DIMACS:
 8720  8721 -8722  490 -8723 0
 8720  8721 -8722  490 -8724 0
 8720  8721 -8722  490 -8725 0

c  0-1 --> -1
c    (-b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧ -p_490) -> ( b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0)
c  in CNF:
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨  b^{5, 99}_2
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_1
c     b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨  b^{5, 99}_0
c  in DIMACS:
 8720  8721  8722  490  8723 0
 8720  8721  8722  490 -8724 0
 8720  8721  8722  490  8725 0

c  -1-1 --> -2
c    ( b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧  b^{5, 98}_0 ∧ -p_490) -> ( b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0)
c  in CNF:
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨  b^{5, 99}_2
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨  b^{5, 99}_1
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨  p_490 ∨ -b^{5, 99}_0
c  in DIMACS:
-8720  8721 -8722  490  8723 0
-8720  8721 -8722  490  8724 0
-8720  8721 -8722  490 -8725 0

c  -2-1 --> break 
c    ( b^{5, 98}_2 ∧  b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨  b^{5, 98}_0 ∨  p_490 ∨ break
c  in DIMACS:
-8720 -8721  8722  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 98}_2 ∧ -b^{5, 98}_1 ∧ -b^{5, 98}_0 ∧ true) 
c  in CNF:
c    -b^{5, 98}_2 ∨  b^{5, 98}_1 ∨  b^{5, 98}_0 ∨ false 
c  in DIMACS:
-8720  8721  8722  0

c  3 does not represent an automaton state.
c    -(-b^{5, 98}_2 ∧  b^{5, 98}_1 ∧  b^{5, 98}_0 ∧ true) 
c  in CNF:
c     b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ false 
c  in DIMACS:
 8720 -8721 -8722  0
c  -3 does not represent an automaton state.
c    -( b^{5, 98}_2 ∧  b^{5, 98}_1 ∧  b^{5, 98}_0 ∧ true) 
c  in CNF:
c    -b^{5, 98}_2 ∨ -b^{5, 98}_1 ∨ -b^{5, 98}_0 ∨ false 
c  in DIMACS:
-8720 -8721 -8722  0

c i = 99
c  -2+1 --> -1
c    ( b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧  p_495) -> ( b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0)
c  in CNF:
c    -b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨  b^{5, 100}_2
c    -b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_1
c    -b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨  b^{5, 100}_0
c  in DIMACS:
-8723 -8724  8725 -495  8726 0
-8723 -8724  8725 -495 -8727 0
-8723 -8724  8725 -495  8728 0

c  -1+1 --> 0
c    ( b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0 ∧  p_495) -> (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧ -b^{5, 100}_0)
c  in CNF:
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_2
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_1
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_0
c  in DIMACS:
-8723  8724 -8725 -495 -8726 0
-8723  8724 -8725 -495 -8727 0
-8723  8724 -8725 -495 -8728 0

c  0+1 --> 1
c    (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧  p_495) -> (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0)
c  in CNF:
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_2
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_1
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨  b^{5, 100}_0
c  in DIMACS:
 8723  8724  8725 -495 -8726 0
 8723  8724  8725 -495 -8727 0
 8723  8724  8725 -495  8728 0

c  1+1 --> 2
c    (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0 ∧  p_495) -> (-b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0)
c  in CNF:
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_2
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨  b^{5, 100}_1
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ -p_495 ∨ -b^{5, 100}_0
c  in DIMACS:
 8723  8724 -8725 -495 -8726 0
 8723  8724 -8725 -495  8727 0
 8723  8724 -8725 -495 -8728 0

c  2+1 --> break 
c    (-b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧  p_495) -> break
c  in CNF:
c     b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 8723 -8724  8725 -495 1162 0


c  2-1 --> 1
c    (-b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧ -p_495) -> (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0)
c  in CNF:
c     b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_2
c     b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_1
c     b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨  b^{5, 100}_0
c  in DIMACS:
 8723 -8724  8725  495 -8726 0
 8723 -8724  8725  495 -8727 0
 8723 -8724  8725  495  8728 0

c  1-1 --> 0
c    (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0 ∧ -p_495) -> (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧ -b^{5, 100}_0)
c  in CNF:
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_2
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_1
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_0
c  in DIMACS:
 8723  8724 -8725  495 -8726 0
 8723  8724 -8725  495 -8727 0
 8723  8724 -8725  495 -8728 0

c  0-1 --> -1
c    (-b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧ -p_495) -> ( b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0)
c  in CNF:
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨  b^{5, 100}_2
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_1
c     b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨  b^{5, 100}_0
c  in DIMACS:
 8723  8724  8725  495  8726 0
 8723  8724  8725  495 -8727 0
 8723  8724  8725  495  8728 0

c  -1-1 --> -2
c    ( b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧  b^{5, 99}_0 ∧ -p_495) -> ( b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0)
c  in CNF:
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨  b^{5, 100}_2
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨  b^{5, 100}_1
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨  p_495 ∨ -b^{5, 100}_0
c  in DIMACS:
-8723  8724 -8725  495  8726 0
-8723  8724 -8725  495  8727 0
-8723  8724 -8725  495 -8728 0

c  -2-1 --> break 
c    ( b^{5, 99}_2 ∧  b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨  b^{5, 99}_0 ∨  p_495 ∨ break
c  in DIMACS:
-8723 -8724  8725  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 99}_2 ∧ -b^{5, 99}_1 ∧ -b^{5, 99}_0 ∧ true) 
c  in CNF:
c    -b^{5, 99}_2 ∨  b^{5, 99}_1 ∨  b^{5, 99}_0 ∨ false 
c  in DIMACS:
-8723  8724  8725  0

c  3 does not represent an automaton state.
c    -(-b^{5, 99}_2 ∧  b^{5, 99}_1 ∧  b^{5, 99}_0 ∧ true) 
c  in CNF:
c     b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ false 
c  in DIMACS:
 8723 -8724 -8725  0
c  -3 does not represent an automaton state.
c    -( b^{5, 99}_2 ∧  b^{5, 99}_1 ∧  b^{5, 99}_0 ∧ true) 
c  in CNF:
c    -b^{5, 99}_2 ∨ -b^{5, 99}_1 ∨ -b^{5, 99}_0 ∨ false 
c  in DIMACS:
-8723 -8724 -8725  0

c i = 100
c  -2+1 --> -1
c    ( b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧  p_500) -> ( b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0)
c  in CNF:
c    -b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨  b^{5, 101}_2
c    -b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_1
c    -b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨  b^{5, 101}_0
c  in DIMACS:
-8726 -8727  8728 -500  8729 0
-8726 -8727  8728 -500 -8730 0
-8726 -8727  8728 -500  8731 0

c  -1+1 --> 0
c    ( b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0 ∧  p_500) -> (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧ -b^{5, 101}_0)
c  in CNF:
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_2
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_1
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_0
c  in DIMACS:
-8726  8727 -8728 -500 -8729 0
-8726  8727 -8728 -500 -8730 0
-8726  8727 -8728 -500 -8731 0

c  0+1 --> 1
c    (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧  p_500) -> (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0)
c  in CNF:
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_2
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_1
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨  b^{5, 101}_0
c  in DIMACS:
 8726  8727  8728 -500 -8729 0
 8726  8727  8728 -500 -8730 0
 8726  8727  8728 -500  8731 0

c  1+1 --> 2
c    (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0 ∧  p_500) -> (-b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0)
c  in CNF:
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_2
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨  b^{5, 101}_1
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ -p_500 ∨ -b^{5, 101}_0
c  in DIMACS:
 8726  8727 -8728 -500 -8729 0
 8726  8727 -8728 -500  8730 0
 8726  8727 -8728 -500 -8731 0

c  2+1 --> break 
c    (-b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧  p_500) -> break
c  in CNF:
c     b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 8726 -8727  8728 -500 1162 0


c  2-1 --> 1
c    (-b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧ -p_500) -> (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0)
c  in CNF:
c     b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_2
c     b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_1
c     b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨  b^{5, 101}_0
c  in DIMACS:
 8726 -8727  8728  500 -8729 0
 8726 -8727  8728  500 -8730 0
 8726 -8727  8728  500  8731 0

c  1-1 --> 0
c    (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0 ∧ -p_500) -> (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧ -b^{5, 101}_0)
c  in CNF:
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_2
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_1
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_0
c  in DIMACS:
 8726  8727 -8728  500 -8729 0
 8726  8727 -8728  500 -8730 0
 8726  8727 -8728  500 -8731 0

c  0-1 --> -1
c    (-b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧ -p_500) -> ( b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0)
c  in CNF:
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨  b^{5, 101}_2
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_1
c     b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨  b^{5, 101}_0
c  in DIMACS:
 8726  8727  8728  500  8729 0
 8726  8727  8728  500 -8730 0
 8726  8727  8728  500  8731 0

c  -1-1 --> -2
c    ( b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧  b^{5, 100}_0 ∧ -p_500) -> ( b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0)
c  in CNF:
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨  b^{5, 101}_2
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨  b^{5, 101}_1
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨  p_500 ∨ -b^{5, 101}_0
c  in DIMACS:
-8726  8727 -8728  500  8729 0
-8726  8727 -8728  500  8730 0
-8726  8727 -8728  500 -8731 0

c  -2-1 --> break 
c    ( b^{5, 100}_2 ∧  b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨  b^{5, 100}_0 ∨  p_500 ∨ break
c  in DIMACS:
-8726 -8727  8728  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 100}_2 ∧ -b^{5, 100}_1 ∧ -b^{5, 100}_0 ∧ true) 
c  in CNF:
c    -b^{5, 100}_2 ∨  b^{5, 100}_1 ∨  b^{5, 100}_0 ∨ false 
c  in DIMACS:
-8726  8727  8728  0

c  3 does not represent an automaton state.
c    -(-b^{5, 100}_2 ∧  b^{5, 100}_1 ∧  b^{5, 100}_0 ∧ true) 
c  in CNF:
c     b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ false 
c  in DIMACS:
 8726 -8727 -8728  0
c  -3 does not represent an automaton state.
c    -( b^{5, 100}_2 ∧  b^{5, 100}_1 ∧  b^{5, 100}_0 ∧ true) 
c  in CNF:
c    -b^{5, 100}_2 ∨ -b^{5, 100}_1 ∨ -b^{5, 100}_0 ∨ false 
c  in DIMACS:
-8726 -8727 -8728  0

c i = 101
c  -2+1 --> -1
c    ( b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧  p_505) -> ( b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0)
c  in CNF:
c    -b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨  b^{5, 102}_2
c    -b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_1
c    -b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨  b^{5, 102}_0
c  in DIMACS:
-8729 -8730  8731 -505  8732 0
-8729 -8730  8731 -505 -8733 0
-8729 -8730  8731 -505  8734 0

c  -1+1 --> 0
c    ( b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0 ∧  p_505) -> (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧ -b^{5, 102}_0)
c  in CNF:
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_2
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_1
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_0
c  in DIMACS:
-8729  8730 -8731 -505 -8732 0
-8729  8730 -8731 -505 -8733 0
-8729  8730 -8731 -505 -8734 0

c  0+1 --> 1
c    (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧  p_505) -> (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0)
c  in CNF:
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_2
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_1
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨  b^{5, 102}_0
c  in DIMACS:
 8729  8730  8731 -505 -8732 0
 8729  8730  8731 -505 -8733 0
 8729  8730  8731 -505  8734 0

c  1+1 --> 2
c    (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0 ∧  p_505) -> (-b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0)
c  in CNF:
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_2
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨  b^{5, 102}_1
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ -p_505 ∨ -b^{5, 102}_0
c  in DIMACS:
 8729  8730 -8731 -505 -8732 0
 8729  8730 -8731 -505  8733 0
 8729  8730 -8731 -505 -8734 0

c  2+1 --> break 
c    (-b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧  p_505) -> break
c  in CNF:
c     b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ -p_505 ∨ break
c  in DIMACS:
 8729 -8730  8731 -505 1162 0


c  2-1 --> 1
c    (-b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧ -p_505) -> (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0)
c  in CNF:
c     b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_2
c     b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_1
c     b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨  b^{5, 102}_0
c  in DIMACS:
 8729 -8730  8731  505 -8732 0
 8729 -8730  8731  505 -8733 0
 8729 -8730  8731  505  8734 0

c  1-1 --> 0
c    (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0 ∧ -p_505) -> (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧ -b^{5, 102}_0)
c  in CNF:
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_2
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_1
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_0
c  in DIMACS:
 8729  8730 -8731  505 -8732 0
 8729  8730 -8731  505 -8733 0
 8729  8730 -8731  505 -8734 0

c  0-1 --> -1
c    (-b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧ -p_505) -> ( b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0)
c  in CNF:
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨  b^{5, 102}_2
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_1
c     b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨  b^{5, 102}_0
c  in DIMACS:
 8729  8730  8731  505  8732 0
 8729  8730  8731  505 -8733 0
 8729  8730  8731  505  8734 0

c  -1-1 --> -2
c    ( b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧  b^{5, 101}_0 ∧ -p_505) -> ( b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0)
c  in CNF:
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨  b^{5, 102}_2
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨  b^{5, 102}_1
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨  p_505 ∨ -b^{5, 102}_0
c  in DIMACS:
-8729  8730 -8731  505  8732 0
-8729  8730 -8731  505  8733 0
-8729  8730 -8731  505 -8734 0

c  -2-1 --> break 
c    ( b^{5, 101}_2 ∧  b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧ -p_505) -> break
c  in CNF:
c    -b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨  b^{5, 101}_0 ∨  p_505 ∨ break
c  in DIMACS:
-8729 -8730  8731  505 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 101}_2 ∧ -b^{5, 101}_1 ∧ -b^{5, 101}_0 ∧ true) 
c  in CNF:
c    -b^{5, 101}_2 ∨  b^{5, 101}_1 ∨  b^{5, 101}_0 ∨ false 
c  in DIMACS:
-8729  8730  8731  0

c  3 does not represent an automaton state.
c    -(-b^{5, 101}_2 ∧  b^{5, 101}_1 ∧  b^{5, 101}_0 ∧ true) 
c  in CNF:
c     b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ false 
c  in DIMACS:
 8729 -8730 -8731  0
c  -3 does not represent an automaton state.
c    -( b^{5, 101}_2 ∧  b^{5, 101}_1 ∧  b^{5, 101}_0 ∧ true) 
c  in CNF:
c    -b^{5, 101}_2 ∨ -b^{5, 101}_1 ∨ -b^{5, 101}_0 ∨ false 
c  in DIMACS:
-8729 -8730 -8731  0

c i = 102
c  -2+1 --> -1
c    ( b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧  p_510) -> ( b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0)
c  in CNF:
c    -b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨  b^{5, 103}_2
c    -b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_1
c    -b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨  b^{5, 103}_0
c  in DIMACS:
-8732 -8733  8734 -510  8735 0
-8732 -8733  8734 -510 -8736 0
-8732 -8733  8734 -510  8737 0

c  -1+1 --> 0
c    ( b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0 ∧  p_510) -> (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧ -b^{5, 103}_0)
c  in CNF:
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_2
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_1
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_0
c  in DIMACS:
-8732  8733 -8734 -510 -8735 0
-8732  8733 -8734 -510 -8736 0
-8732  8733 -8734 -510 -8737 0

c  0+1 --> 1
c    (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧  p_510) -> (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0)
c  in CNF:
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_2
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_1
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨  b^{5, 103}_0
c  in DIMACS:
 8732  8733  8734 -510 -8735 0
 8732  8733  8734 -510 -8736 0
 8732  8733  8734 -510  8737 0

c  1+1 --> 2
c    (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0 ∧  p_510) -> (-b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0)
c  in CNF:
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_2
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨  b^{5, 103}_1
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ -p_510 ∨ -b^{5, 103}_0
c  in DIMACS:
 8732  8733 -8734 -510 -8735 0
 8732  8733 -8734 -510  8736 0
 8732  8733 -8734 -510 -8737 0

c  2+1 --> break 
c    (-b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧  p_510) -> break
c  in CNF:
c     b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 8732 -8733  8734 -510 1162 0


c  2-1 --> 1
c    (-b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧ -p_510) -> (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0)
c  in CNF:
c     b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_2
c     b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_1
c     b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨  b^{5, 103}_0
c  in DIMACS:
 8732 -8733  8734  510 -8735 0
 8732 -8733  8734  510 -8736 0
 8732 -8733  8734  510  8737 0

c  1-1 --> 0
c    (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0 ∧ -p_510) -> (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧ -b^{5, 103}_0)
c  in CNF:
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_2
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_1
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_0
c  in DIMACS:
 8732  8733 -8734  510 -8735 0
 8732  8733 -8734  510 -8736 0
 8732  8733 -8734  510 -8737 0

c  0-1 --> -1
c    (-b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧ -p_510) -> ( b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0)
c  in CNF:
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨  b^{5, 103}_2
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_1
c     b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨  b^{5, 103}_0
c  in DIMACS:
 8732  8733  8734  510  8735 0
 8732  8733  8734  510 -8736 0
 8732  8733  8734  510  8737 0

c  -1-1 --> -2
c    ( b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧  b^{5, 102}_0 ∧ -p_510) -> ( b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0)
c  in CNF:
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨  b^{5, 103}_2
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨  b^{5, 103}_1
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨  p_510 ∨ -b^{5, 103}_0
c  in DIMACS:
-8732  8733 -8734  510  8735 0
-8732  8733 -8734  510  8736 0
-8732  8733 -8734  510 -8737 0

c  -2-1 --> break 
c    ( b^{5, 102}_2 ∧  b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨  b^{5, 102}_0 ∨  p_510 ∨ break
c  in DIMACS:
-8732 -8733  8734  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 102}_2 ∧ -b^{5, 102}_1 ∧ -b^{5, 102}_0 ∧ true) 
c  in CNF:
c    -b^{5, 102}_2 ∨  b^{5, 102}_1 ∨  b^{5, 102}_0 ∨ false 
c  in DIMACS:
-8732  8733  8734  0

c  3 does not represent an automaton state.
c    -(-b^{5, 102}_2 ∧  b^{5, 102}_1 ∧  b^{5, 102}_0 ∧ true) 
c  in CNF:
c     b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ false 
c  in DIMACS:
 8732 -8733 -8734  0
c  -3 does not represent an automaton state.
c    -( b^{5, 102}_2 ∧  b^{5, 102}_1 ∧  b^{5, 102}_0 ∧ true) 
c  in CNF:
c    -b^{5, 102}_2 ∨ -b^{5, 102}_1 ∨ -b^{5, 102}_0 ∨ false 
c  in DIMACS:
-8732 -8733 -8734  0

c i = 103
c  -2+1 --> -1
c    ( b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧  p_515) -> ( b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0)
c  in CNF:
c    -b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨  b^{5, 104}_2
c    -b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_1
c    -b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨  b^{5, 104}_0
c  in DIMACS:
-8735 -8736  8737 -515  8738 0
-8735 -8736  8737 -515 -8739 0
-8735 -8736  8737 -515  8740 0

c  -1+1 --> 0
c    ( b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0 ∧  p_515) -> (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧ -b^{5, 104}_0)
c  in CNF:
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_2
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_1
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_0
c  in DIMACS:
-8735  8736 -8737 -515 -8738 0
-8735  8736 -8737 -515 -8739 0
-8735  8736 -8737 -515 -8740 0

c  0+1 --> 1
c    (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧  p_515) -> (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0)
c  in CNF:
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_2
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_1
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨  b^{5, 104}_0
c  in DIMACS:
 8735  8736  8737 -515 -8738 0
 8735  8736  8737 -515 -8739 0
 8735  8736  8737 -515  8740 0

c  1+1 --> 2
c    (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0 ∧  p_515) -> (-b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0)
c  in CNF:
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_2
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨  b^{5, 104}_1
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ -p_515 ∨ -b^{5, 104}_0
c  in DIMACS:
 8735  8736 -8737 -515 -8738 0
 8735  8736 -8737 -515  8739 0
 8735  8736 -8737 -515 -8740 0

c  2+1 --> break 
c    (-b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧  p_515) -> break
c  in CNF:
c     b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ -p_515 ∨ break
c  in DIMACS:
 8735 -8736  8737 -515 1162 0


c  2-1 --> 1
c    (-b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧ -p_515) -> (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0)
c  in CNF:
c     b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_2
c     b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_1
c     b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨  b^{5, 104}_0
c  in DIMACS:
 8735 -8736  8737  515 -8738 0
 8735 -8736  8737  515 -8739 0
 8735 -8736  8737  515  8740 0

c  1-1 --> 0
c    (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0 ∧ -p_515) -> (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧ -b^{5, 104}_0)
c  in CNF:
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_2
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_1
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_0
c  in DIMACS:
 8735  8736 -8737  515 -8738 0
 8735  8736 -8737  515 -8739 0
 8735  8736 -8737  515 -8740 0

c  0-1 --> -1
c    (-b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧ -p_515) -> ( b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0)
c  in CNF:
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨  b^{5, 104}_2
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_1
c     b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨  b^{5, 104}_0
c  in DIMACS:
 8735  8736  8737  515  8738 0
 8735  8736  8737  515 -8739 0
 8735  8736  8737  515  8740 0

c  -1-1 --> -2
c    ( b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧  b^{5, 103}_0 ∧ -p_515) -> ( b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0)
c  in CNF:
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨  b^{5, 104}_2
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨  b^{5, 104}_1
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨  p_515 ∨ -b^{5, 104}_0
c  in DIMACS:
-8735  8736 -8737  515  8738 0
-8735  8736 -8737  515  8739 0
-8735  8736 -8737  515 -8740 0

c  -2-1 --> break 
c    ( b^{5, 103}_2 ∧  b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧ -p_515) -> break
c  in CNF:
c    -b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨  b^{5, 103}_0 ∨  p_515 ∨ break
c  in DIMACS:
-8735 -8736  8737  515 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 103}_2 ∧ -b^{5, 103}_1 ∧ -b^{5, 103}_0 ∧ true) 
c  in CNF:
c    -b^{5, 103}_2 ∨  b^{5, 103}_1 ∨  b^{5, 103}_0 ∨ false 
c  in DIMACS:
-8735  8736  8737  0

c  3 does not represent an automaton state.
c    -(-b^{5, 103}_2 ∧  b^{5, 103}_1 ∧  b^{5, 103}_0 ∧ true) 
c  in CNF:
c     b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ false 
c  in DIMACS:
 8735 -8736 -8737  0
c  -3 does not represent an automaton state.
c    -( b^{5, 103}_2 ∧  b^{5, 103}_1 ∧  b^{5, 103}_0 ∧ true) 
c  in CNF:
c    -b^{5, 103}_2 ∨ -b^{5, 103}_1 ∨ -b^{5, 103}_0 ∨ false 
c  in DIMACS:
-8735 -8736 -8737  0

c i = 104
c  -2+1 --> -1
c    ( b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧  p_520) -> ( b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0)
c  in CNF:
c    -b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨  b^{5, 105}_2
c    -b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_1
c    -b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨  b^{5, 105}_0
c  in DIMACS:
-8738 -8739  8740 -520  8741 0
-8738 -8739  8740 -520 -8742 0
-8738 -8739  8740 -520  8743 0

c  -1+1 --> 0
c    ( b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0 ∧  p_520) -> (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧ -b^{5, 105}_0)
c  in CNF:
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_2
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_1
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_0
c  in DIMACS:
-8738  8739 -8740 -520 -8741 0
-8738  8739 -8740 -520 -8742 0
-8738  8739 -8740 -520 -8743 0

c  0+1 --> 1
c    (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧  p_520) -> (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0)
c  in CNF:
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_2
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_1
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨  b^{5, 105}_0
c  in DIMACS:
 8738  8739  8740 -520 -8741 0
 8738  8739  8740 -520 -8742 0
 8738  8739  8740 -520  8743 0

c  1+1 --> 2
c    (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0 ∧  p_520) -> (-b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0)
c  in CNF:
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_2
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨  b^{5, 105}_1
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ -p_520 ∨ -b^{5, 105}_0
c  in DIMACS:
 8738  8739 -8740 -520 -8741 0
 8738  8739 -8740 -520  8742 0
 8738  8739 -8740 -520 -8743 0

c  2+1 --> break 
c    (-b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧  p_520) -> break
c  in CNF:
c     b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 8738 -8739  8740 -520 1162 0


c  2-1 --> 1
c    (-b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧ -p_520) -> (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0)
c  in CNF:
c     b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_2
c     b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_1
c     b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨  b^{5, 105}_0
c  in DIMACS:
 8738 -8739  8740  520 -8741 0
 8738 -8739  8740  520 -8742 0
 8738 -8739  8740  520  8743 0

c  1-1 --> 0
c    (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0 ∧ -p_520) -> (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧ -b^{5, 105}_0)
c  in CNF:
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_2
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_1
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_0
c  in DIMACS:
 8738  8739 -8740  520 -8741 0
 8738  8739 -8740  520 -8742 0
 8738  8739 -8740  520 -8743 0

c  0-1 --> -1
c    (-b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧ -p_520) -> ( b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0)
c  in CNF:
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨  b^{5, 105}_2
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_1
c     b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨  b^{5, 105}_0
c  in DIMACS:
 8738  8739  8740  520  8741 0
 8738  8739  8740  520 -8742 0
 8738  8739  8740  520  8743 0

c  -1-1 --> -2
c    ( b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧  b^{5, 104}_0 ∧ -p_520) -> ( b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0)
c  in CNF:
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨  b^{5, 105}_2
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨  b^{5, 105}_1
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨  p_520 ∨ -b^{5, 105}_0
c  in DIMACS:
-8738  8739 -8740  520  8741 0
-8738  8739 -8740  520  8742 0
-8738  8739 -8740  520 -8743 0

c  -2-1 --> break 
c    ( b^{5, 104}_2 ∧  b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨  b^{5, 104}_0 ∨  p_520 ∨ break
c  in DIMACS:
-8738 -8739  8740  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 104}_2 ∧ -b^{5, 104}_1 ∧ -b^{5, 104}_0 ∧ true) 
c  in CNF:
c    -b^{5, 104}_2 ∨  b^{5, 104}_1 ∨  b^{5, 104}_0 ∨ false 
c  in DIMACS:
-8738  8739  8740  0

c  3 does not represent an automaton state.
c    -(-b^{5, 104}_2 ∧  b^{5, 104}_1 ∧  b^{5, 104}_0 ∧ true) 
c  in CNF:
c     b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ false 
c  in DIMACS:
 8738 -8739 -8740  0
c  -3 does not represent an automaton state.
c    -( b^{5, 104}_2 ∧  b^{5, 104}_1 ∧  b^{5, 104}_0 ∧ true) 
c  in CNF:
c    -b^{5, 104}_2 ∨ -b^{5, 104}_1 ∨ -b^{5, 104}_0 ∨ false 
c  in DIMACS:
-8738 -8739 -8740  0

c i = 105
c  -2+1 --> -1
c    ( b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧  p_525) -> ( b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0)
c  in CNF:
c    -b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨  b^{5, 106}_2
c    -b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_1
c    -b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨  b^{5, 106}_0
c  in DIMACS:
-8741 -8742  8743 -525  8744 0
-8741 -8742  8743 -525 -8745 0
-8741 -8742  8743 -525  8746 0

c  -1+1 --> 0
c    ( b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0 ∧  p_525) -> (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧ -b^{5, 106}_0)
c  in CNF:
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_2
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_1
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_0
c  in DIMACS:
-8741  8742 -8743 -525 -8744 0
-8741  8742 -8743 -525 -8745 0
-8741  8742 -8743 -525 -8746 0

c  0+1 --> 1
c    (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧  p_525) -> (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0)
c  in CNF:
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_2
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_1
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨  b^{5, 106}_0
c  in DIMACS:
 8741  8742  8743 -525 -8744 0
 8741  8742  8743 -525 -8745 0
 8741  8742  8743 -525  8746 0

c  1+1 --> 2
c    (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0 ∧  p_525) -> (-b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0)
c  in CNF:
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_2
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨  b^{5, 106}_1
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ -p_525 ∨ -b^{5, 106}_0
c  in DIMACS:
 8741  8742 -8743 -525 -8744 0
 8741  8742 -8743 -525  8745 0
 8741  8742 -8743 -525 -8746 0

c  2+1 --> break 
c    (-b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧  p_525) -> break
c  in CNF:
c     b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 8741 -8742  8743 -525 1162 0


c  2-1 --> 1
c    (-b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧ -p_525) -> (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0)
c  in CNF:
c     b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_2
c     b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_1
c     b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨  b^{5, 106}_0
c  in DIMACS:
 8741 -8742  8743  525 -8744 0
 8741 -8742  8743  525 -8745 0
 8741 -8742  8743  525  8746 0

c  1-1 --> 0
c    (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0 ∧ -p_525) -> (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧ -b^{5, 106}_0)
c  in CNF:
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_2
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_1
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_0
c  in DIMACS:
 8741  8742 -8743  525 -8744 0
 8741  8742 -8743  525 -8745 0
 8741  8742 -8743  525 -8746 0

c  0-1 --> -1
c    (-b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧ -p_525) -> ( b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0)
c  in CNF:
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨  b^{5, 106}_2
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_1
c     b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨  b^{5, 106}_0
c  in DIMACS:
 8741  8742  8743  525  8744 0
 8741  8742  8743  525 -8745 0
 8741  8742  8743  525  8746 0

c  -1-1 --> -2
c    ( b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧  b^{5, 105}_0 ∧ -p_525) -> ( b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0)
c  in CNF:
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨  b^{5, 106}_2
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨  b^{5, 106}_1
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨  p_525 ∨ -b^{5, 106}_0
c  in DIMACS:
-8741  8742 -8743  525  8744 0
-8741  8742 -8743  525  8745 0
-8741  8742 -8743  525 -8746 0

c  -2-1 --> break 
c    ( b^{5, 105}_2 ∧  b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨  b^{5, 105}_0 ∨  p_525 ∨ break
c  in DIMACS:
-8741 -8742  8743  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 105}_2 ∧ -b^{5, 105}_1 ∧ -b^{5, 105}_0 ∧ true) 
c  in CNF:
c    -b^{5, 105}_2 ∨  b^{5, 105}_1 ∨  b^{5, 105}_0 ∨ false 
c  in DIMACS:
-8741  8742  8743  0

c  3 does not represent an automaton state.
c    -(-b^{5, 105}_2 ∧  b^{5, 105}_1 ∧  b^{5, 105}_0 ∧ true) 
c  in CNF:
c     b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ false 
c  in DIMACS:
 8741 -8742 -8743  0
c  -3 does not represent an automaton state.
c    -( b^{5, 105}_2 ∧  b^{5, 105}_1 ∧  b^{5, 105}_0 ∧ true) 
c  in CNF:
c    -b^{5, 105}_2 ∨ -b^{5, 105}_1 ∨ -b^{5, 105}_0 ∨ false 
c  in DIMACS:
-8741 -8742 -8743  0

c i = 106
c  -2+1 --> -1
c    ( b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧  p_530) -> ( b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0)
c  in CNF:
c    -b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨  b^{5, 107}_2
c    -b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_1
c    -b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨  b^{5, 107}_0
c  in DIMACS:
-8744 -8745  8746 -530  8747 0
-8744 -8745  8746 -530 -8748 0
-8744 -8745  8746 -530  8749 0

c  -1+1 --> 0
c    ( b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0 ∧  p_530) -> (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧ -b^{5, 107}_0)
c  in CNF:
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_2
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_1
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_0
c  in DIMACS:
-8744  8745 -8746 -530 -8747 0
-8744  8745 -8746 -530 -8748 0
-8744  8745 -8746 -530 -8749 0

c  0+1 --> 1
c    (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧  p_530) -> (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0)
c  in CNF:
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_2
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_1
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨  b^{5, 107}_0
c  in DIMACS:
 8744  8745  8746 -530 -8747 0
 8744  8745  8746 -530 -8748 0
 8744  8745  8746 -530  8749 0

c  1+1 --> 2
c    (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0 ∧  p_530) -> (-b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0)
c  in CNF:
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_2
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨  b^{5, 107}_1
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ -p_530 ∨ -b^{5, 107}_0
c  in DIMACS:
 8744  8745 -8746 -530 -8747 0
 8744  8745 -8746 -530  8748 0
 8744  8745 -8746 -530 -8749 0

c  2+1 --> break 
c    (-b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧  p_530) -> break
c  in CNF:
c     b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 8744 -8745  8746 -530 1162 0


c  2-1 --> 1
c    (-b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧ -p_530) -> (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0)
c  in CNF:
c     b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_2
c     b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_1
c     b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨  b^{5, 107}_0
c  in DIMACS:
 8744 -8745  8746  530 -8747 0
 8744 -8745  8746  530 -8748 0
 8744 -8745  8746  530  8749 0

c  1-1 --> 0
c    (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0 ∧ -p_530) -> (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧ -b^{5, 107}_0)
c  in CNF:
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_2
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_1
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_0
c  in DIMACS:
 8744  8745 -8746  530 -8747 0
 8744  8745 -8746  530 -8748 0
 8744  8745 -8746  530 -8749 0

c  0-1 --> -1
c    (-b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧ -p_530) -> ( b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0)
c  in CNF:
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨  b^{5, 107}_2
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_1
c     b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨  b^{5, 107}_0
c  in DIMACS:
 8744  8745  8746  530  8747 0
 8744  8745  8746  530 -8748 0
 8744  8745  8746  530  8749 0

c  -1-1 --> -2
c    ( b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧  b^{5, 106}_0 ∧ -p_530) -> ( b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0)
c  in CNF:
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨  b^{5, 107}_2
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨  b^{5, 107}_1
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨  p_530 ∨ -b^{5, 107}_0
c  in DIMACS:
-8744  8745 -8746  530  8747 0
-8744  8745 -8746  530  8748 0
-8744  8745 -8746  530 -8749 0

c  -2-1 --> break 
c    ( b^{5, 106}_2 ∧  b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨  b^{5, 106}_0 ∨  p_530 ∨ break
c  in DIMACS:
-8744 -8745  8746  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 106}_2 ∧ -b^{5, 106}_1 ∧ -b^{5, 106}_0 ∧ true) 
c  in CNF:
c    -b^{5, 106}_2 ∨  b^{5, 106}_1 ∨  b^{5, 106}_0 ∨ false 
c  in DIMACS:
-8744  8745  8746  0

c  3 does not represent an automaton state.
c    -(-b^{5, 106}_2 ∧  b^{5, 106}_1 ∧  b^{5, 106}_0 ∧ true) 
c  in CNF:
c     b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ false 
c  in DIMACS:
 8744 -8745 -8746  0
c  -3 does not represent an automaton state.
c    -( b^{5, 106}_2 ∧  b^{5, 106}_1 ∧  b^{5, 106}_0 ∧ true) 
c  in CNF:
c    -b^{5, 106}_2 ∨ -b^{5, 106}_1 ∨ -b^{5, 106}_0 ∨ false 
c  in DIMACS:
-8744 -8745 -8746  0

c i = 107
c  -2+1 --> -1
c    ( b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧  p_535) -> ( b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0)
c  in CNF:
c    -b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨  b^{5, 108}_2
c    -b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_1
c    -b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨  b^{5, 108}_0
c  in DIMACS:
-8747 -8748  8749 -535  8750 0
-8747 -8748  8749 -535 -8751 0
-8747 -8748  8749 -535  8752 0

c  -1+1 --> 0
c    ( b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0 ∧  p_535) -> (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧ -b^{5, 108}_0)
c  in CNF:
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_2
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_1
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_0
c  in DIMACS:
-8747  8748 -8749 -535 -8750 0
-8747  8748 -8749 -535 -8751 0
-8747  8748 -8749 -535 -8752 0

c  0+1 --> 1
c    (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧  p_535) -> (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0)
c  in CNF:
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_2
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_1
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨  b^{5, 108}_0
c  in DIMACS:
 8747  8748  8749 -535 -8750 0
 8747  8748  8749 -535 -8751 0
 8747  8748  8749 -535  8752 0

c  1+1 --> 2
c    (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0 ∧  p_535) -> (-b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0)
c  in CNF:
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_2
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨  b^{5, 108}_1
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ -p_535 ∨ -b^{5, 108}_0
c  in DIMACS:
 8747  8748 -8749 -535 -8750 0
 8747  8748 -8749 -535  8751 0
 8747  8748 -8749 -535 -8752 0

c  2+1 --> break 
c    (-b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧  p_535) -> break
c  in CNF:
c     b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ -p_535 ∨ break
c  in DIMACS:
 8747 -8748  8749 -535 1162 0


c  2-1 --> 1
c    (-b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧ -p_535) -> (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0)
c  in CNF:
c     b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_2
c     b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_1
c     b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨  b^{5, 108}_0
c  in DIMACS:
 8747 -8748  8749  535 -8750 0
 8747 -8748  8749  535 -8751 0
 8747 -8748  8749  535  8752 0

c  1-1 --> 0
c    (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0 ∧ -p_535) -> (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧ -b^{5, 108}_0)
c  in CNF:
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_2
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_1
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_0
c  in DIMACS:
 8747  8748 -8749  535 -8750 0
 8747  8748 -8749  535 -8751 0
 8747  8748 -8749  535 -8752 0

c  0-1 --> -1
c    (-b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧ -p_535) -> ( b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0)
c  in CNF:
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨  b^{5, 108}_2
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_1
c     b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨  b^{5, 108}_0
c  in DIMACS:
 8747  8748  8749  535  8750 0
 8747  8748  8749  535 -8751 0
 8747  8748  8749  535  8752 0

c  -1-1 --> -2
c    ( b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧  b^{5, 107}_0 ∧ -p_535) -> ( b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0)
c  in CNF:
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨  b^{5, 108}_2
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨  b^{5, 108}_1
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨  p_535 ∨ -b^{5, 108}_0
c  in DIMACS:
-8747  8748 -8749  535  8750 0
-8747  8748 -8749  535  8751 0
-8747  8748 -8749  535 -8752 0

c  -2-1 --> break 
c    ( b^{5, 107}_2 ∧  b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧ -p_535) -> break
c  in CNF:
c    -b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨  b^{5, 107}_0 ∨  p_535 ∨ break
c  in DIMACS:
-8747 -8748  8749  535 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 107}_2 ∧ -b^{5, 107}_1 ∧ -b^{5, 107}_0 ∧ true) 
c  in CNF:
c    -b^{5, 107}_2 ∨  b^{5, 107}_1 ∨  b^{5, 107}_0 ∨ false 
c  in DIMACS:
-8747  8748  8749  0

c  3 does not represent an automaton state.
c    -(-b^{5, 107}_2 ∧  b^{5, 107}_1 ∧  b^{5, 107}_0 ∧ true) 
c  in CNF:
c     b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ false 
c  in DIMACS:
 8747 -8748 -8749  0
c  -3 does not represent an automaton state.
c    -( b^{5, 107}_2 ∧  b^{5, 107}_1 ∧  b^{5, 107}_0 ∧ true) 
c  in CNF:
c    -b^{5, 107}_2 ∨ -b^{5, 107}_1 ∨ -b^{5, 107}_0 ∨ false 
c  in DIMACS:
-8747 -8748 -8749  0

c i = 108
c  -2+1 --> -1
c    ( b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧  p_540) -> ( b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0)
c  in CNF:
c    -b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨  b^{5, 109}_2
c    -b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_1
c    -b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨  b^{5, 109}_0
c  in DIMACS:
-8750 -8751  8752 -540  8753 0
-8750 -8751  8752 -540 -8754 0
-8750 -8751  8752 -540  8755 0

c  -1+1 --> 0
c    ( b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0 ∧  p_540) -> (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧ -b^{5, 109}_0)
c  in CNF:
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_2
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_1
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_0
c  in DIMACS:
-8750  8751 -8752 -540 -8753 0
-8750  8751 -8752 -540 -8754 0
-8750  8751 -8752 -540 -8755 0

c  0+1 --> 1
c    (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧  p_540) -> (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0)
c  in CNF:
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_2
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_1
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨  b^{5, 109}_0
c  in DIMACS:
 8750  8751  8752 -540 -8753 0
 8750  8751  8752 -540 -8754 0
 8750  8751  8752 -540  8755 0

c  1+1 --> 2
c    (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0 ∧  p_540) -> (-b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0)
c  in CNF:
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_2
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨  b^{5, 109}_1
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ -p_540 ∨ -b^{5, 109}_0
c  in DIMACS:
 8750  8751 -8752 -540 -8753 0
 8750  8751 -8752 -540  8754 0
 8750  8751 -8752 -540 -8755 0

c  2+1 --> break 
c    (-b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧  p_540) -> break
c  in CNF:
c     b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 8750 -8751  8752 -540 1162 0


c  2-1 --> 1
c    (-b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧ -p_540) -> (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0)
c  in CNF:
c     b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_2
c     b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_1
c     b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨  b^{5, 109}_0
c  in DIMACS:
 8750 -8751  8752  540 -8753 0
 8750 -8751  8752  540 -8754 0
 8750 -8751  8752  540  8755 0

c  1-1 --> 0
c    (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0 ∧ -p_540) -> (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧ -b^{5, 109}_0)
c  in CNF:
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_2
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_1
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_0
c  in DIMACS:
 8750  8751 -8752  540 -8753 0
 8750  8751 -8752  540 -8754 0
 8750  8751 -8752  540 -8755 0

c  0-1 --> -1
c    (-b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧ -p_540) -> ( b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0)
c  in CNF:
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨  b^{5, 109}_2
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_1
c     b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨  b^{5, 109}_0
c  in DIMACS:
 8750  8751  8752  540  8753 0
 8750  8751  8752  540 -8754 0
 8750  8751  8752  540  8755 0

c  -1-1 --> -2
c    ( b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧  b^{5, 108}_0 ∧ -p_540) -> ( b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0)
c  in CNF:
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨  b^{5, 109}_2
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨  b^{5, 109}_1
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨  p_540 ∨ -b^{5, 109}_0
c  in DIMACS:
-8750  8751 -8752  540  8753 0
-8750  8751 -8752  540  8754 0
-8750  8751 -8752  540 -8755 0

c  -2-1 --> break 
c    ( b^{5, 108}_2 ∧  b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨  b^{5, 108}_0 ∨  p_540 ∨ break
c  in DIMACS:
-8750 -8751  8752  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 108}_2 ∧ -b^{5, 108}_1 ∧ -b^{5, 108}_0 ∧ true) 
c  in CNF:
c    -b^{5, 108}_2 ∨  b^{5, 108}_1 ∨  b^{5, 108}_0 ∨ false 
c  in DIMACS:
-8750  8751  8752  0

c  3 does not represent an automaton state.
c    -(-b^{5, 108}_2 ∧  b^{5, 108}_1 ∧  b^{5, 108}_0 ∧ true) 
c  in CNF:
c     b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ false 
c  in DIMACS:
 8750 -8751 -8752  0
c  -3 does not represent an automaton state.
c    -( b^{5, 108}_2 ∧  b^{5, 108}_1 ∧  b^{5, 108}_0 ∧ true) 
c  in CNF:
c    -b^{5, 108}_2 ∨ -b^{5, 108}_1 ∨ -b^{5, 108}_0 ∨ false 
c  in DIMACS:
-8750 -8751 -8752  0

c i = 109
c  -2+1 --> -1
c    ( b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧  p_545) -> ( b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0)
c  in CNF:
c    -b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨  b^{5, 110}_2
c    -b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_1
c    -b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨  b^{5, 110}_0
c  in DIMACS:
-8753 -8754  8755 -545  8756 0
-8753 -8754  8755 -545 -8757 0
-8753 -8754  8755 -545  8758 0

c  -1+1 --> 0
c    ( b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0 ∧  p_545) -> (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧ -b^{5, 110}_0)
c  in CNF:
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_2
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_1
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_0
c  in DIMACS:
-8753  8754 -8755 -545 -8756 0
-8753  8754 -8755 -545 -8757 0
-8753  8754 -8755 -545 -8758 0

c  0+1 --> 1
c    (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧  p_545) -> (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0)
c  in CNF:
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_2
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_1
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨  b^{5, 110}_0
c  in DIMACS:
 8753  8754  8755 -545 -8756 0
 8753  8754  8755 -545 -8757 0
 8753  8754  8755 -545  8758 0

c  1+1 --> 2
c    (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0 ∧  p_545) -> (-b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0)
c  in CNF:
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_2
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨  b^{5, 110}_1
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ -p_545 ∨ -b^{5, 110}_0
c  in DIMACS:
 8753  8754 -8755 -545 -8756 0
 8753  8754 -8755 -545  8757 0
 8753  8754 -8755 -545 -8758 0

c  2+1 --> break 
c    (-b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧  p_545) -> break
c  in CNF:
c     b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ -p_545 ∨ break
c  in DIMACS:
 8753 -8754  8755 -545 1162 0


c  2-1 --> 1
c    (-b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧ -p_545) -> (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0)
c  in CNF:
c     b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_2
c     b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_1
c     b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨  b^{5, 110}_0
c  in DIMACS:
 8753 -8754  8755  545 -8756 0
 8753 -8754  8755  545 -8757 0
 8753 -8754  8755  545  8758 0

c  1-1 --> 0
c    (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0 ∧ -p_545) -> (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧ -b^{5, 110}_0)
c  in CNF:
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_2
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_1
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_0
c  in DIMACS:
 8753  8754 -8755  545 -8756 0
 8753  8754 -8755  545 -8757 0
 8753  8754 -8755  545 -8758 0

c  0-1 --> -1
c    (-b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧ -p_545) -> ( b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0)
c  in CNF:
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨  b^{5, 110}_2
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_1
c     b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨  b^{5, 110}_0
c  in DIMACS:
 8753  8754  8755  545  8756 0
 8753  8754  8755  545 -8757 0
 8753  8754  8755  545  8758 0

c  -1-1 --> -2
c    ( b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧  b^{5, 109}_0 ∧ -p_545) -> ( b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0)
c  in CNF:
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨  b^{5, 110}_2
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨  b^{5, 110}_1
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨  p_545 ∨ -b^{5, 110}_0
c  in DIMACS:
-8753  8754 -8755  545  8756 0
-8753  8754 -8755  545  8757 0
-8753  8754 -8755  545 -8758 0

c  -2-1 --> break 
c    ( b^{5, 109}_2 ∧  b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧ -p_545) -> break
c  in CNF:
c    -b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨  b^{5, 109}_0 ∨  p_545 ∨ break
c  in DIMACS:
-8753 -8754  8755  545 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 109}_2 ∧ -b^{5, 109}_1 ∧ -b^{5, 109}_0 ∧ true) 
c  in CNF:
c    -b^{5, 109}_2 ∨  b^{5, 109}_1 ∨  b^{5, 109}_0 ∨ false 
c  in DIMACS:
-8753  8754  8755  0

c  3 does not represent an automaton state.
c    -(-b^{5, 109}_2 ∧  b^{5, 109}_1 ∧  b^{5, 109}_0 ∧ true) 
c  in CNF:
c     b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ false 
c  in DIMACS:
 8753 -8754 -8755  0
c  -3 does not represent an automaton state.
c    -( b^{5, 109}_2 ∧  b^{5, 109}_1 ∧  b^{5, 109}_0 ∧ true) 
c  in CNF:
c    -b^{5, 109}_2 ∨ -b^{5, 109}_1 ∨ -b^{5, 109}_0 ∨ false 
c  in DIMACS:
-8753 -8754 -8755  0

c i = 110
c  -2+1 --> -1
c    ( b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧  p_550) -> ( b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0)
c  in CNF:
c    -b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨  b^{5, 111}_2
c    -b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_1
c    -b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨  b^{5, 111}_0
c  in DIMACS:
-8756 -8757  8758 -550  8759 0
-8756 -8757  8758 -550 -8760 0
-8756 -8757  8758 -550  8761 0

c  -1+1 --> 0
c    ( b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0 ∧  p_550) -> (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧ -b^{5, 111}_0)
c  in CNF:
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_2
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_1
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_0
c  in DIMACS:
-8756  8757 -8758 -550 -8759 0
-8756  8757 -8758 -550 -8760 0
-8756  8757 -8758 -550 -8761 0

c  0+1 --> 1
c    (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧  p_550) -> (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0)
c  in CNF:
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_2
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_1
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨  b^{5, 111}_0
c  in DIMACS:
 8756  8757  8758 -550 -8759 0
 8756  8757  8758 -550 -8760 0
 8756  8757  8758 -550  8761 0

c  1+1 --> 2
c    (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0 ∧  p_550) -> (-b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0)
c  in CNF:
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_2
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨  b^{5, 111}_1
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ -p_550 ∨ -b^{5, 111}_0
c  in DIMACS:
 8756  8757 -8758 -550 -8759 0
 8756  8757 -8758 -550  8760 0
 8756  8757 -8758 -550 -8761 0

c  2+1 --> break 
c    (-b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧  p_550) -> break
c  in CNF:
c     b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 8756 -8757  8758 -550 1162 0


c  2-1 --> 1
c    (-b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧ -p_550) -> (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0)
c  in CNF:
c     b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_2
c     b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_1
c     b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨  b^{5, 111}_0
c  in DIMACS:
 8756 -8757  8758  550 -8759 0
 8756 -8757  8758  550 -8760 0
 8756 -8757  8758  550  8761 0

c  1-1 --> 0
c    (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0 ∧ -p_550) -> (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧ -b^{5, 111}_0)
c  in CNF:
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_2
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_1
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_0
c  in DIMACS:
 8756  8757 -8758  550 -8759 0
 8756  8757 -8758  550 -8760 0
 8756  8757 -8758  550 -8761 0

c  0-1 --> -1
c    (-b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧ -p_550) -> ( b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0)
c  in CNF:
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨  b^{5, 111}_2
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_1
c     b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨  b^{5, 111}_0
c  in DIMACS:
 8756  8757  8758  550  8759 0
 8756  8757  8758  550 -8760 0
 8756  8757  8758  550  8761 0

c  -1-1 --> -2
c    ( b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧  b^{5, 110}_0 ∧ -p_550) -> ( b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0)
c  in CNF:
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨  b^{5, 111}_2
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨  b^{5, 111}_1
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨  p_550 ∨ -b^{5, 111}_0
c  in DIMACS:
-8756  8757 -8758  550  8759 0
-8756  8757 -8758  550  8760 0
-8756  8757 -8758  550 -8761 0

c  -2-1 --> break 
c    ( b^{5, 110}_2 ∧  b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨  b^{5, 110}_0 ∨  p_550 ∨ break
c  in DIMACS:
-8756 -8757  8758  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 110}_2 ∧ -b^{5, 110}_1 ∧ -b^{5, 110}_0 ∧ true) 
c  in CNF:
c    -b^{5, 110}_2 ∨  b^{5, 110}_1 ∨  b^{5, 110}_0 ∨ false 
c  in DIMACS:
-8756  8757  8758  0

c  3 does not represent an automaton state.
c    -(-b^{5, 110}_2 ∧  b^{5, 110}_1 ∧  b^{5, 110}_0 ∧ true) 
c  in CNF:
c     b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ false 
c  in DIMACS:
 8756 -8757 -8758  0
c  -3 does not represent an automaton state.
c    -( b^{5, 110}_2 ∧  b^{5, 110}_1 ∧  b^{5, 110}_0 ∧ true) 
c  in CNF:
c    -b^{5, 110}_2 ∨ -b^{5, 110}_1 ∨ -b^{5, 110}_0 ∨ false 
c  in DIMACS:
-8756 -8757 -8758  0

c i = 111
c  -2+1 --> -1
c    ( b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧  p_555) -> ( b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0)
c  in CNF:
c    -b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨  b^{5, 112}_2
c    -b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_1
c    -b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨  b^{5, 112}_0
c  in DIMACS:
-8759 -8760  8761 -555  8762 0
-8759 -8760  8761 -555 -8763 0
-8759 -8760  8761 -555  8764 0

c  -1+1 --> 0
c    ( b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0 ∧  p_555) -> (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧ -b^{5, 112}_0)
c  in CNF:
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_2
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_1
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_0
c  in DIMACS:
-8759  8760 -8761 -555 -8762 0
-8759  8760 -8761 -555 -8763 0
-8759  8760 -8761 -555 -8764 0

c  0+1 --> 1
c    (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧  p_555) -> (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0)
c  in CNF:
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_2
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_1
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨  b^{5, 112}_0
c  in DIMACS:
 8759  8760  8761 -555 -8762 0
 8759  8760  8761 -555 -8763 0
 8759  8760  8761 -555  8764 0

c  1+1 --> 2
c    (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0 ∧  p_555) -> (-b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0)
c  in CNF:
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_2
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨  b^{5, 112}_1
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ -p_555 ∨ -b^{5, 112}_0
c  in DIMACS:
 8759  8760 -8761 -555 -8762 0
 8759  8760 -8761 -555  8763 0
 8759  8760 -8761 -555 -8764 0

c  2+1 --> break 
c    (-b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧  p_555) -> break
c  in CNF:
c     b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 8759 -8760  8761 -555 1162 0


c  2-1 --> 1
c    (-b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧ -p_555) -> (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0)
c  in CNF:
c     b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_2
c     b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_1
c     b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨  b^{5, 112}_0
c  in DIMACS:
 8759 -8760  8761  555 -8762 0
 8759 -8760  8761  555 -8763 0
 8759 -8760  8761  555  8764 0

c  1-1 --> 0
c    (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0 ∧ -p_555) -> (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧ -b^{5, 112}_0)
c  in CNF:
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_2
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_1
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_0
c  in DIMACS:
 8759  8760 -8761  555 -8762 0
 8759  8760 -8761  555 -8763 0
 8759  8760 -8761  555 -8764 0

c  0-1 --> -1
c    (-b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧ -p_555) -> ( b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0)
c  in CNF:
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨  b^{5, 112}_2
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_1
c     b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨  b^{5, 112}_0
c  in DIMACS:
 8759  8760  8761  555  8762 0
 8759  8760  8761  555 -8763 0
 8759  8760  8761  555  8764 0

c  -1-1 --> -2
c    ( b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧  b^{5, 111}_0 ∧ -p_555) -> ( b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0)
c  in CNF:
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨  b^{5, 112}_2
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨  b^{5, 112}_1
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨  p_555 ∨ -b^{5, 112}_0
c  in DIMACS:
-8759  8760 -8761  555  8762 0
-8759  8760 -8761  555  8763 0
-8759  8760 -8761  555 -8764 0

c  -2-1 --> break 
c    ( b^{5, 111}_2 ∧  b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨  b^{5, 111}_0 ∨  p_555 ∨ break
c  in DIMACS:
-8759 -8760  8761  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 111}_2 ∧ -b^{5, 111}_1 ∧ -b^{5, 111}_0 ∧ true) 
c  in CNF:
c    -b^{5, 111}_2 ∨  b^{5, 111}_1 ∨  b^{5, 111}_0 ∨ false 
c  in DIMACS:
-8759  8760  8761  0

c  3 does not represent an automaton state.
c    -(-b^{5, 111}_2 ∧  b^{5, 111}_1 ∧  b^{5, 111}_0 ∧ true) 
c  in CNF:
c     b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ false 
c  in DIMACS:
 8759 -8760 -8761  0
c  -3 does not represent an automaton state.
c    -( b^{5, 111}_2 ∧  b^{5, 111}_1 ∧  b^{5, 111}_0 ∧ true) 
c  in CNF:
c    -b^{5, 111}_2 ∨ -b^{5, 111}_1 ∨ -b^{5, 111}_0 ∨ false 
c  in DIMACS:
-8759 -8760 -8761  0

c i = 112
c  -2+1 --> -1
c    ( b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧  p_560) -> ( b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0)
c  in CNF:
c    -b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨  b^{5, 113}_2
c    -b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_1
c    -b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨  b^{5, 113}_0
c  in DIMACS:
-8762 -8763  8764 -560  8765 0
-8762 -8763  8764 -560 -8766 0
-8762 -8763  8764 -560  8767 0

c  -1+1 --> 0
c    ( b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0 ∧  p_560) -> (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧ -b^{5, 113}_0)
c  in CNF:
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_2
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_1
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_0
c  in DIMACS:
-8762  8763 -8764 -560 -8765 0
-8762  8763 -8764 -560 -8766 0
-8762  8763 -8764 -560 -8767 0

c  0+1 --> 1
c    (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧  p_560) -> (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0)
c  in CNF:
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_2
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_1
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨  b^{5, 113}_0
c  in DIMACS:
 8762  8763  8764 -560 -8765 0
 8762  8763  8764 -560 -8766 0
 8762  8763  8764 -560  8767 0

c  1+1 --> 2
c    (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0 ∧  p_560) -> (-b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0)
c  in CNF:
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_2
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨  b^{5, 113}_1
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ -p_560 ∨ -b^{5, 113}_0
c  in DIMACS:
 8762  8763 -8764 -560 -8765 0
 8762  8763 -8764 -560  8766 0
 8762  8763 -8764 -560 -8767 0

c  2+1 --> break 
c    (-b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧  p_560) -> break
c  in CNF:
c     b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 8762 -8763  8764 -560 1162 0


c  2-1 --> 1
c    (-b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧ -p_560) -> (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0)
c  in CNF:
c     b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_2
c     b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_1
c     b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨  b^{5, 113}_0
c  in DIMACS:
 8762 -8763  8764  560 -8765 0
 8762 -8763  8764  560 -8766 0
 8762 -8763  8764  560  8767 0

c  1-1 --> 0
c    (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0 ∧ -p_560) -> (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧ -b^{5, 113}_0)
c  in CNF:
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_2
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_1
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_0
c  in DIMACS:
 8762  8763 -8764  560 -8765 0
 8762  8763 -8764  560 -8766 0
 8762  8763 -8764  560 -8767 0

c  0-1 --> -1
c    (-b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧ -p_560) -> ( b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0)
c  in CNF:
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨  b^{5, 113}_2
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_1
c     b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨  b^{5, 113}_0
c  in DIMACS:
 8762  8763  8764  560  8765 0
 8762  8763  8764  560 -8766 0
 8762  8763  8764  560  8767 0

c  -1-1 --> -2
c    ( b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧  b^{5, 112}_0 ∧ -p_560) -> ( b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0)
c  in CNF:
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨  b^{5, 113}_2
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨  b^{5, 113}_1
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨  p_560 ∨ -b^{5, 113}_0
c  in DIMACS:
-8762  8763 -8764  560  8765 0
-8762  8763 -8764  560  8766 0
-8762  8763 -8764  560 -8767 0

c  -2-1 --> break 
c    ( b^{5, 112}_2 ∧  b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨  b^{5, 112}_0 ∨  p_560 ∨ break
c  in DIMACS:
-8762 -8763  8764  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 112}_2 ∧ -b^{5, 112}_1 ∧ -b^{5, 112}_0 ∧ true) 
c  in CNF:
c    -b^{5, 112}_2 ∨  b^{5, 112}_1 ∨  b^{5, 112}_0 ∨ false 
c  in DIMACS:
-8762  8763  8764  0

c  3 does not represent an automaton state.
c    -(-b^{5, 112}_2 ∧  b^{5, 112}_1 ∧  b^{5, 112}_0 ∧ true) 
c  in CNF:
c     b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ false 
c  in DIMACS:
 8762 -8763 -8764  0
c  -3 does not represent an automaton state.
c    -( b^{5, 112}_2 ∧  b^{5, 112}_1 ∧  b^{5, 112}_0 ∧ true) 
c  in CNF:
c    -b^{5, 112}_2 ∨ -b^{5, 112}_1 ∨ -b^{5, 112}_0 ∨ false 
c  in DIMACS:
-8762 -8763 -8764  0

c i = 113
c  -2+1 --> -1
c    ( b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧  p_565) -> ( b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0)
c  in CNF:
c    -b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨  b^{5, 114}_2
c    -b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_1
c    -b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨  b^{5, 114}_0
c  in DIMACS:
-8765 -8766  8767 -565  8768 0
-8765 -8766  8767 -565 -8769 0
-8765 -8766  8767 -565  8770 0

c  -1+1 --> 0
c    ( b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0 ∧  p_565) -> (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧ -b^{5, 114}_0)
c  in CNF:
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_2
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_1
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_0
c  in DIMACS:
-8765  8766 -8767 -565 -8768 0
-8765  8766 -8767 -565 -8769 0
-8765  8766 -8767 -565 -8770 0

c  0+1 --> 1
c    (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧  p_565) -> (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0)
c  in CNF:
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_2
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_1
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨  b^{5, 114}_0
c  in DIMACS:
 8765  8766  8767 -565 -8768 0
 8765  8766  8767 -565 -8769 0
 8765  8766  8767 -565  8770 0

c  1+1 --> 2
c    (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0 ∧  p_565) -> (-b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0)
c  in CNF:
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_2
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨  b^{5, 114}_1
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ -p_565 ∨ -b^{5, 114}_0
c  in DIMACS:
 8765  8766 -8767 -565 -8768 0
 8765  8766 -8767 -565  8769 0
 8765  8766 -8767 -565 -8770 0

c  2+1 --> break 
c    (-b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧  p_565) -> break
c  in CNF:
c     b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ -p_565 ∨ break
c  in DIMACS:
 8765 -8766  8767 -565 1162 0


c  2-1 --> 1
c    (-b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧ -p_565) -> (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0)
c  in CNF:
c     b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_2
c     b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_1
c     b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨  b^{5, 114}_0
c  in DIMACS:
 8765 -8766  8767  565 -8768 0
 8765 -8766  8767  565 -8769 0
 8765 -8766  8767  565  8770 0

c  1-1 --> 0
c    (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0 ∧ -p_565) -> (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧ -b^{5, 114}_0)
c  in CNF:
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_2
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_1
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_0
c  in DIMACS:
 8765  8766 -8767  565 -8768 0
 8765  8766 -8767  565 -8769 0
 8765  8766 -8767  565 -8770 0

c  0-1 --> -1
c    (-b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧ -p_565) -> ( b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0)
c  in CNF:
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨  b^{5, 114}_2
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_1
c     b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨  b^{5, 114}_0
c  in DIMACS:
 8765  8766  8767  565  8768 0
 8765  8766  8767  565 -8769 0
 8765  8766  8767  565  8770 0

c  -1-1 --> -2
c    ( b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧  b^{5, 113}_0 ∧ -p_565) -> ( b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0)
c  in CNF:
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨  b^{5, 114}_2
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨  b^{5, 114}_1
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨  p_565 ∨ -b^{5, 114}_0
c  in DIMACS:
-8765  8766 -8767  565  8768 0
-8765  8766 -8767  565  8769 0
-8765  8766 -8767  565 -8770 0

c  -2-1 --> break 
c    ( b^{5, 113}_2 ∧  b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧ -p_565) -> break
c  in CNF:
c    -b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨  b^{5, 113}_0 ∨  p_565 ∨ break
c  in DIMACS:
-8765 -8766  8767  565 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 113}_2 ∧ -b^{5, 113}_1 ∧ -b^{5, 113}_0 ∧ true) 
c  in CNF:
c    -b^{5, 113}_2 ∨  b^{5, 113}_1 ∨  b^{5, 113}_0 ∨ false 
c  in DIMACS:
-8765  8766  8767  0

c  3 does not represent an automaton state.
c    -(-b^{5, 113}_2 ∧  b^{5, 113}_1 ∧  b^{5, 113}_0 ∧ true) 
c  in CNF:
c     b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ false 
c  in DIMACS:
 8765 -8766 -8767  0
c  -3 does not represent an automaton state.
c    -( b^{5, 113}_2 ∧  b^{5, 113}_1 ∧  b^{5, 113}_0 ∧ true) 
c  in CNF:
c    -b^{5, 113}_2 ∨ -b^{5, 113}_1 ∨ -b^{5, 113}_0 ∨ false 
c  in DIMACS:
-8765 -8766 -8767  0

c i = 114
c  -2+1 --> -1
c    ( b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧  p_570) -> ( b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0)
c  in CNF:
c    -b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨  b^{5, 115}_2
c    -b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_1
c    -b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨  b^{5, 115}_0
c  in DIMACS:
-8768 -8769  8770 -570  8771 0
-8768 -8769  8770 -570 -8772 0
-8768 -8769  8770 -570  8773 0

c  -1+1 --> 0
c    ( b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0 ∧  p_570) -> (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧ -b^{5, 115}_0)
c  in CNF:
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_2
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_1
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_0
c  in DIMACS:
-8768  8769 -8770 -570 -8771 0
-8768  8769 -8770 -570 -8772 0
-8768  8769 -8770 -570 -8773 0

c  0+1 --> 1
c    (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧  p_570) -> (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0)
c  in CNF:
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_2
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_1
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨  b^{5, 115}_0
c  in DIMACS:
 8768  8769  8770 -570 -8771 0
 8768  8769  8770 -570 -8772 0
 8768  8769  8770 -570  8773 0

c  1+1 --> 2
c    (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0 ∧  p_570) -> (-b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0)
c  in CNF:
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_2
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨  b^{5, 115}_1
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ -p_570 ∨ -b^{5, 115}_0
c  in DIMACS:
 8768  8769 -8770 -570 -8771 0
 8768  8769 -8770 -570  8772 0
 8768  8769 -8770 -570 -8773 0

c  2+1 --> break 
c    (-b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧  p_570) -> break
c  in CNF:
c     b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 8768 -8769  8770 -570 1162 0


c  2-1 --> 1
c    (-b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧ -p_570) -> (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0)
c  in CNF:
c     b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_2
c     b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_1
c     b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨  b^{5, 115}_0
c  in DIMACS:
 8768 -8769  8770  570 -8771 0
 8768 -8769  8770  570 -8772 0
 8768 -8769  8770  570  8773 0

c  1-1 --> 0
c    (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0 ∧ -p_570) -> (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧ -b^{5, 115}_0)
c  in CNF:
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_2
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_1
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_0
c  in DIMACS:
 8768  8769 -8770  570 -8771 0
 8768  8769 -8770  570 -8772 0
 8768  8769 -8770  570 -8773 0

c  0-1 --> -1
c    (-b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧ -p_570) -> ( b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0)
c  in CNF:
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨  b^{5, 115}_2
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_1
c     b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨  b^{5, 115}_0
c  in DIMACS:
 8768  8769  8770  570  8771 0
 8768  8769  8770  570 -8772 0
 8768  8769  8770  570  8773 0

c  -1-1 --> -2
c    ( b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧  b^{5, 114}_0 ∧ -p_570) -> ( b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0)
c  in CNF:
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨  b^{5, 115}_2
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨  b^{5, 115}_1
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨  p_570 ∨ -b^{5, 115}_0
c  in DIMACS:
-8768  8769 -8770  570  8771 0
-8768  8769 -8770  570  8772 0
-8768  8769 -8770  570 -8773 0

c  -2-1 --> break 
c    ( b^{5, 114}_2 ∧  b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨  b^{5, 114}_0 ∨  p_570 ∨ break
c  in DIMACS:
-8768 -8769  8770  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 114}_2 ∧ -b^{5, 114}_1 ∧ -b^{5, 114}_0 ∧ true) 
c  in CNF:
c    -b^{5, 114}_2 ∨  b^{5, 114}_1 ∨  b^{5, 114}_0 ∨ false 
c  in DIMACS:
-8768  8769  8770  0

c  3 does not represent an automaton state.
c    -(-b^{5, 114}_2 ∧  b^{5, 114}_1 ∧  b^{5, 114}_0 ∧ true) 
c  in CNF:
c     b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ false 
c  in DIMACS:
 8768 -8769 -8770  0
c  -3 does not represent an automaton state.
c    -( b^{5, 114}_2 ∧  b^{5, 114}_1 ∧  b^{5, 114}_0 ∧ true) 
c  in CNF:
c    -b^{5, 114}_2 ∨ -b^{5, 114}_1 ∨ -b^{5, 114}_0 ∨ false 
c  in DIMACS:
-8768 -8769 -8770  0

c i = 115
c  -2+1 --> -1
c    ( b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧  p_575) -> ( b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0)
c  in CNF:
c    -b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨  b^{5, 116}_2
c    -b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_1
c    -b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨  b^{5, 116}_0
c  in DIMACS:
-8771 -8772  8773 -575  8774 0
-8771 -8772  8773 -575 -8775 0
-8771 -8772  8773 -575  8776 0

c  -1+1 --> 0
c    ( b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0 ∧  p_575) -> (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧ -b^{5, 116}_0)
c  in CNF:
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_2
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_1
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_0
c  in DIMACS:
-8771  8772 -8773 -575 -8774 0
-8771  8772 -8773 -575 -8775 0
-8771  8772 -8773 -575 -8776 0

c  0+1 --> 1
c    (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧  p_575) -> (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0)
c  in CNF:
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_2
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_1
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨  b^{5, 116}_0
c  in DIMACS:
 8771  8772  8773 -575 -8774 0
 8771  8772  8773 -575 -8775 0
 8771  8772  8773 -575  8776 0

c  1+1 --> 2
c    (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0 ∧  p_575) -> (-b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0)
c  in CNF:
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_2
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨  b^{5, 116}_1
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ -p_575 ∨ -b^{5, 116}_0
c  in DIMACS:
 8771  8772 -8773 -575 -8774 0
 8771  8772 -8773 -575  8775 0
 8771  8772 -8773 -575 -8776 0

c  2+1 --> break 
c    (-b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧  p_575) -> break
c  in CNF:
c     b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ -p_575 ∨ break
c  in DIMACS:
 8771 -8772  8773 -575 1162 0


c  2-1 --> 1
c    (-b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧ -p_575) -> (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0)
c  in CNF:
c     b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_2
c     b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_1
c     b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨  b^{5, 116}_0
c  in DIMACS:
 8771 -8772  8773  575 -8774 0
 8771 -8772  8773  575 -8775 0
 8771 -8772  8773  575  8776 0

c  1-1 --> 0
c    (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0 ∧ -p_575) -> (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧ -b^{5, 116}_0)
c  in CNF:
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_2
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_1
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_0
c  in DIMACS:
 8771  8772 -8773  575 -8774 0
 8771  8772 -8773  575 -8775 0
 8771  8772 -8773  575 -8776 0

c  0-1 --> -1
c    (-b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧ -p_575) -> ( b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0)
c  in CNF:
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨  b^{5, 116}_2
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_1
c     b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨  b^{5, 116}_0
c  in DIMACS:
 8771  8772  8773  575  8774 0
 8771  8772  8773  575 -8775 0
 8771  8772  8773  575  8776 0

c  -1-1 --> -2
c    ( b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧  b^{5, 115}_0 ∧ -p_575) -> ( b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0)
c  in CNF:
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨  b^{5, 116}_2
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨  b^{5, 116}_1
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨  p_575 ∨ -b^{5, 116}_0
c  in DIMACS:
-8771  8772 -8773  575  8774 0
-8771  8772 -8773  575  8775 0
-8771  8772 -8773  575 -8776 0

c  -2-1 --> break 
c    ( b^{5, 115}_2 ∧  b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧ -p_575) -> break
c  in CNF:
c    -b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨  b^{5, 115}_0 ∨  p_575 ∨ break
c  in DIMACS:
-8771 -8772  8773  575 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 115}_2 ∧ -b^{5, 115}_1 ∧ -b^{5, 115}_0 ∧ true) 
c  in CNF:
c    -b^{5, 115}_2 ∨  b^{5, 115}_1 ∨  b^{5, 115}_0 ∨ false 
c  in DIMACS:
-8771  8772  8773  0

c  3 does not represent an automaton state.
c    -(-b^{5, 115}_2 ∧  b^{5, 115}_1 ∧  b^{5, 115}_0 ∧ true) 
c  in CNF:
c     b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ false 
c  in DIMACS:
 8771 -8772 -8773  0
c  -3 does not represent an automaton state.
c    -( b^{5, 115}_2 ∧  b^{5, 115}_1 ∧  b^{5, 115}_0 ∧ true) 
c  in CNF:
c    -b^{5, 115}_2 ∨ -b^{5, 115}_1 ∨ -b^{5, 115}_0 ∨ false 
c  in DIMACS:
-8771 -8772 -8773  0

c i = 116
c  -2+1 --> -1
c    ( b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧  p_580) -> ( b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0)
c  in CNF:
c    -b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨  b^{5, 117}_2
c    -b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_1
c    -b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨  b^{5, 117}_0
c  in DIMACS:
-8774 -8775  8776 -580  8777 0
-8774 -8775  8776 -580 -8778 0
-8774 -8775  8776 -580  8779 0

c  -1+1 --> 0
c    ( b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0 ∧  p_580) -> (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧ -b^{5, 117}_0)
c  in CNF:
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_2
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_1
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_0
c  in DIMACS:
-8774  8775 -8776 -580 -8777 0
-8774  8775 -8776 -580 -8778 0
-8774  8775 -8776 -580 -8779 0

c  0+1 --> 1
c    (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧  p_580) -> (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0)
c  in CNF:
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_2
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_1
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨  b^{5, 117}_0
c  in DIMACS:
 8774  8775  8776 -580 -8777 0
 8774  8775  8776 -580 -8778 0
 8774  8775  8776 -580  8779 0

c  1+1 --> 2
c    (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0 ∧  p_580) -> (-b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0)
c  in CNF:
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_2
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨  b^{5, 117}_1
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ -p_580 ∨ -b^{5, 117}_0
c  in DIMACS:
 8774  8775 -8776 -580 -8777 0
 8774  8775 -8776 -580  8778 0
 8774  8775 -8776 -580 -8779 0

c  2+1 --> break 
c    (-b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧  p_580) -> break
c  in CNF:
c     b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 8774 -8775  8776 -580 1162 0


c  2-1 --> 1
c    (-b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧ -p_580) -> (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0)
c  in CNF:
c     b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_2
c     b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_1
c     b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨  b^{5, 117}_0
c  in DIMACS:
 8774 -8775  8776  580 -8777 0
 8774 -8775  8776  580 -8778 0
 8774 -8775  8776  580  8779 0

c  1-1 --> 0
c    (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0 ∧ -p_580) -> (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧ -b^{5, 117}_0)
c  in CNF:
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_2
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_1
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_0
c  in DIMACS:
 8774  8775 -8776  580 -8777 0
 8774  8775 -8776  580 -8778 0
 8774  8775 -8776  580 -8779 0

c  0-1 --> -1
c    (-b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧ -p_580) -> ( b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0)
c  in CNF:
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨  b^{5, 117}_2
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_1
c     b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨  b^{5, 117}_0
c  in DIMACS:
 8774  8775  8776  580  8777 0
 8774  8775  8776  580 -8778 0
 8774  8775  8776  580  8779 0

c  -1-1 --> -2
c    ( b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧  b^{5, 116}_0 ∧ -p_580) -> ( b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0)
c  in CNF:
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨  b^{5, 117}_2
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨  b^{5, 117}_1
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨  p_580 ∨ -b^{5, 117}_0
c  in DIMACS:
-8774  8775 -8776  580  8777 0
-8774  8775 -8776  580  8778 0
-8774  8775 -8776  580 -8779 0

c  -2-1 --> break 
c    ( b^{5, 116}_2 ∧  b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨  b^{5, 116}_0 ∨  p_580 ∨ break
c  in DIMACS:
-8774 -8775  8776  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 116}_2 ∧ -b^{5, 116}_1 ∧ -b^{5, 116}_0 ∧ true) 
c  in CNF:
c    -b^{5, 116}_2 ∨  b^{5, 116}_1 ∨  b^{5, 116}_0 ∨ false 
c  in DIMACS:
-8774  8775  8776  0

c  3 does not represent an automaton state.
c    -(-b^{5, 116}_2 ∧  b^{5, 116}_1 ∧  b^{5, 116}_0 ∧ true) 
c  in CNF:
c     b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ false 
c  in DIMACS:
 8774 -8775 -8776  0
c  -3 does not represent an automaton state.
c    -( b^{5, 116}_2 ∧  b^{5, 116}_1 ∧  b^{5, 116}_0 ∧ true) 
c  in CNF:
c    -b^{5, 116}_2 ∨ -b^{5, 116}_1 ∨ -b^{5, 116}_0 ∨ false 
c  in DIMACS:
-8774 -8775 -8776  0

c i = 117
c  -2+1 --> -1
c    ( b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧  p_585) -> ( b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0)
c  in CNF:
c    -b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨  b^{5, 118}_2
c    -b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_1
c    -b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨  b^{5, 118}_0
c  in DIMACS:
-8777 -8778  8779 -585  8780 0
-8777 -8778  8779 -585 -8781 0
-8777 -8778  8779 -585  8782 0

c  -1+1 --> 0
c    ( b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0 ∧  p_585) -> (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧ -b^{5, 118}_0)
c  in CNF:
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_2
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_1
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_0
c  in DIMACS:
-8777  8778 -8779 -585 -8780 0
-8777  8778 -8779 -585 -8781 0
-8777  8778 -8779 -585 -8782 0

c  0+1 --> 1
c    (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧  p_585) -> (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0)
c  in CNF:
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_2
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_1
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨  b^{5, 118}_0
c  in DIMACS:
 8777  8778  8779 -585 -8780 0
 8777  8778  8779 -585 -8781 0
 8777  8778  8779 -585  8782 0

c  1+1 --> 2
c    (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0 ∧  p_585) -> (-b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0)
c  in CNF:
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_2
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨  b^{5, 118}_1
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ -p_585 ∨ -b^{5, 118}_0
c  in DIMACS:
 8777  8778 -8779 -585 -8780 0
 8777  8778 -8779 -585  8781 0
 8777  8778 -8779 -585 -8782 0

c  2+1 --> break 
c    (-b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧  p_585) -> break
c  in CNF:
c     b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 8777 -8778  8779 -585 1162 0


c  2-1 --> 1
c    (-b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧ -p_585) -> (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0)
c  in CNF:
c     b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_2
c     b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_1
c     b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨  b^{5, 118}_0
c  in DIMACS:
 8777 -8778  8779  585 -8780 0
 8777 -8778  8779  585 -8781 0
 8777 -8778  8779  585  8782 0

c  1-1 --> 0
c    (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0 ∧ -p_585) -> (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧ -b^{5, 118}_0)
c  in CNF:
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_2
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_1
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_0
c  in DIMACS:
 8777  8778 -8779  585 -8780 0
 8777  8778 -8779  585 -8781 0
 8777  8778 -8779  585 -8782 0

c  0-1 --> -1
c    (-b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧ -p_585) -> ( b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0)
c  in CNF:
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨  b^{5, 118}_2
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_1
c     b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨  b^{5, 118}_0
c  in DIMACS:
 8777  8778  8779  585  8780 0
 8777  8778  8779  585 -8781 0
 8777  8778  8779  585  8782 0

c  -1-1 --> -2
c    ( b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧  b^{5, 117}_0 ∧ -p_585) -> ( b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0)
c  in CNF:
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨  b^{5, 118}_2
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨  b^{5, 118}_1
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨  p_585 ∨ -b^{5, 118}_0
c  in DIMACS:
-8777  8778 -8779  585  8780 0
-8777  8778 -8779  585  8781 0
-8777  8778 -8779  585 -8782 0

c  -2-1 --> break 
c    ( b^{5, 117}_2 ∧  b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨  b^{5, 117}_0 ∨  p_585 ∨ break
c  in DIMACS:
-8777 -8778  8779  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 117}_2 ∧ -b^{5, 117}_1 ∧ -b^{5, 117}_0 ∧ true) 
c  in CNF:
c    -b^{5, 117}_2 ∨  b^{5, 117}_1 ∨  b^{5, 117}_0 ∨ false 
c  in DIMACS:
-8777  8778  8779  0

c  3 does not represent an automaton state.
c    -(-b^{5, 117}_2 ∧  b^{5, 117}_1 ∧  b^{5, 117}_0 ∧ true) 
c  in CNF:
c     b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ false 
c  in DIMACS:
 8777 -8778 -8779  0
c  -3 does not represent an automaton state.
c    -( b^{5, 117}_2 ∧  b^{5, 117}_1 ∧  b^{5, 117}_0 ∧ true) 
c  in CNF:
c    -b^{5, 117}_2 ∨ -b^{5, 117}_1 ∨ -b^{5, 117}_0 ∨ false 
c  in DIMACS:
-8777 -8778 -8779  0

c i = 118
c  -2+1 --> -1
c    ( b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧  p_590) -> ( b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0)
c  in CNF:
c    -b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨  b^{5, 119}_2
c    -b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_1
c    -b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨  b^{5, 119}_0
c  in DIMACS:
-8780 -8781  8782 -590  8783 0
-8780 -8781  8782 -590 -8784 0
-8780 -8781  8782 -590  8785 0

c  -1+1 --> 0
c    ( b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0 ∧  p_590) -> (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧ -b^{5, 119}_0)
c  in CNF:
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_2
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_1
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_0
c  in DIMACS:
-8780  8781 -8782 -590 -8783 0
-8780  8781 -8782 -590 -8784 0
-8780  8781 -8782 -590 -8785 0

c  0+1 --> 1
c    (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧  p_590) -> (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0)
c  in CNF:
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_2
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_1
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨  b^{5, 119}_0
c  in DIMACS:
 8780  8781  8782 -590 -8783 0
 8780  8781  8782 -590 -8784 0
 8780  8781  8782 -590  8785 0

c  1+1 --> 2
c    (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0 ∧  p_590) -> (-b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0)
c  in CNF:
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_2
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨  b^{5, 119}_1
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ -p_590 ∨ -b^{5, 119}_0
c  in DIMACS:
 8780  8781 -8782 -590 -8783 0
 8780  8781 -8782 -590  8784 0
 8780  8781 -8782 -590 -8785 0

c  2+1 --> break 
c    (-b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧  p_590) -> break
c  in CNF:
c     b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 8780 -8781  8782 -590 1162 0


c  2-1 --> 1
c    (-b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧ -p_590) -> (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0)
c  in CNF:
c     b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_2
c     b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_1
c     b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨  b^{5, 119}_0
c  in DIMACS:
 8780 -8781  8782  590 -8783 0
 8780 -8781  8782  590 -8784 0
 8780 -8781  8782  590  8785 0

c  1-1 --> 0
c    (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0 ∧ -p_590) -> (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧ -b^{5, 119}_0)
c  in CNF:
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_2
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_1
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_0
c  in DIMACS:
 8780  8781 -8782  590 -8783 0
 8780  8781 -8782  590 -8784 0
 8780  8781 -8782  590 -8785 0

c  0-1 --> -1
c    (-b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧ -p_590) -> ( b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0)
c  in CNF:
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨  b^{5, 119}_2
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_1
c     b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨  b^{5, 119}_0
c  in DIMACS:
 8780  8781  8782  590  8783 0
 8780  8781  8782  590 -8784 0
 8780  8781  8782  590  8785 0

c  -1-1 --> -2
c    ( b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧  b^{5, 118}_0 ∧ -p_590) -> ( b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0)
c  in CNF:
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨  b^{5, 119}_2
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨  b^{5, 119}_1
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨  p_590 ∨ -b^{5, 119}_0
c  in DIMACS:
-8780  8781 -8782  590  8783 0
-8780  8781 -8782  590  8784 0
-8780  8781 -8782  590 -8785 0

c  -2-1 --> break 
c    ( b^{5, 118}_2 ∧  b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨  b^{5, 118}_0 ∨  p_590 ∨ break
c  in DIMACS:
-8780 -8781  8782  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 118}_2 ∧ -b^{5, 118}_1 ∧ -b^{5, 118}_0 ∧ true) 
c  in CNF:
c    -b^{5, 118}_2 ∨  b^{5, 118}_1 ∨  b^{5, 118}_0 ∨ false 
c  in DIMACS:
-8780  8781  8782  0

c  3 does not represent an automaton state.
c    -(-b^{5, 118}_2 ∧  b^{5, 118}_1 ∧  b^{5, 118}_0 ∧ true) 
c  in CNF:
c     b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ false 
c  in DIMACS:
 8780 -8781 -8782  0
c  -3 does not represent an automaton state.
c    -( b^{5, 118}_2 ∧  b^{5, 118}_1 ∧  b^{5, 118}_0 ∧ true) 
c  in CNF:
c    -b^{5, 118}_2 ∨ -b^{5, 118}_1 ∨ -b^{5, 118}_0 ∨ false 
c  in DIMACS:
-8780 -8781 -8782  0

c i = 119
c  -2+1 --> -1
c    ( b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧  p_595) -> ( b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0)
c  in CNF:
c    -b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨  b^{5, 120}_2
c    -b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_1
c    -b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨  b^{5, 120}_0
c  in DIMACS:
-8783 -8784  8785 -595  8786 0
-8783 -8784  8785 -595 -8787 0
-8783 -8784  8785 -595  8788 0

c  -1+1 --> 0
c    ( b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0 ∧  p_595) -> (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧ -b^{5, 120}_0)
c  in CNF:
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_2
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_1
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_0
c  in DIMACS:
-8783  8784 -8785 -595 -8786 0
-8783  8784 -8785 -595 -8787 0
-8783  8784 -8785 -595 -8788 0

c  0+1 --> 1
c    (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧  p_595) -> (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0)
c  in CNF:
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_2
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_1
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨  b^{5, 120}_0
c  in DIMACS:
 8783  8784  8785 -595 -8786 0
 8783  8784  8785 -595 -8787 0
 8783  8784  8785 -595  8788 0

c  1+1 --> 2
c    (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0 ∧  p_595) -> (-b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0)
c  in CNF:
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_2
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨  b^{5, 120}_1
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ -p_595 ∨ -b^{5, 120}_0
c  in DIMACS:
 8783  8784 -8785 -595 -8786 0
 8783  8784 -8785 -595  8787 0
 8783  8784 -8785 -595 -8788 0

c  2+1 --> break 
c    (-b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧  p_595) -> break
c  in CNF:
c     b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 8783 -8784  8785 -595 1162 0


c  2-1 --> 1
c    (-b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧ -p_595) -> (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0)
c  in CNF:
c     b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_2
c     b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_1
c     b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨  b^{5, 120}_0
c  in DIMACS:
 8783 -8784  8785  595 -8786 0
 8783 -8784  8785  595 -8787 0
 8783 -8784  8785  595  8788 0

c  1-1 --> 0
c    (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0 ∧ -p_595) -> (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧ -b^{5, 120}_0)
c  in CNF:
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_2
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_1
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_0
c  in DIMACS:
 8783  8784 -8785  595 -8786 0
 8783  8784 -8785  595 -8787 0
 8783  8784 -8785  595 -8788 0

c  0-1 --> -1
c    (-b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧ -p_595) -> ( b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0)
c  in CNF:
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨  b^{5, 120}_2
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_1
c     b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨  b^{5, 120}_0
c  in DIMACS:
 8783  8784  8785  595  8786 0
 8783  8784  8785  595 -8787 0
 8783  8784  8785  595  8788 0

c  -1-1 --> -2
c    ( b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧  b^{5, 119}_0 ∧ -p_595) -> ( b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0)
c  in CNF:
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨  b^{5, 120}_2
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨  b^{5, 120}_1
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨  p_595 ∨ -b^{5, 120}_0
c  in DIMACS:
-8783  8784 -8785  595  8786 0
-8783  8784 -8785  595  8787 0
-8783  8784 -8785  595 -8788 0

c  -2-1 --> break 
c    ( b^{5, 119}_2 ∧  b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨  b^{5, 119}_0 ∨  p_595 ∨ break
c  in DIMACS:
-8783 -8784  8785  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 119}_2 ∧ -b^{5, 119}_1 ∧ -b^{5, 119}_0 ∧ true) 
c  in CNF:
c    -b^{5, 119}_2 ∨  b^{5, 119}_1 ∨  b^{5, 119}_0 ∨ false 
c  in DIMACS:
-8783  8784  8785  0

c  3 does not represent an automaton state.
c    -(-b^{5, 119}_2 ∧  b^{5, 119}_1 ∧  b^{5, 119}_0 ∧ true) 
c  in CNF:
c     b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ false 
c  in DIMACS:
 8783 -8784 -8785  0
c  -3 does not represent an automaton state.
c    -( b^{5, 119}_2 ∧  b^{5, 119}_1 ∧  b^{5, 119}_0 ∧ true) 
c  in CNF:
c    -b^{5, 119}_2 ∨ -b^{5, 119}_1 ∨ -b^{5, 119}_0 ∨ false 
c  in DIMACS:
-8783 -8784 -8785  0

c i = 120
c  -2+1 --> -1
c    ( b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧  p_600) -> ( b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0)
c  in CNF:
c    -b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨  b^{5, 121}_2
c    -b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_1
c    -b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨  b^{5, 121}_0
c  in DIMACS:
-8786 -8787  8788 -600  8789 0
-8786 -8787  8788 -600 -8790 0
-8786 -8787  8788 -600  8791 0

c  -1+1 --> 0
c    ( b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0 ∧  p_600) -> (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧ -b^{5, 121}_0)
c  in CNF:
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_2
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_1
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_0
c  in DIMACS:
-8786  8787 -8788 -600 -8789 0
-8786  8787 -8788 -600 -8790 0
-8786  8787 -8788 -600 -8791 0

c  0+1 --> 1
c    (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧  p_600) -> (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0)
c  in CNF:
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_2
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_1
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨  b^{5, 121}_0
c  in DIMACS:
 8786  8787  8788 -600 -8789 0
 8786  8787  8788 -600 -8790 0
 8786  8787  8788 -600  8791 0

c  1+1 --> 2
c    (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0 ∧  p_600) -> (-b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0)
c  in CNF:
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_2
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨  b^{5, 121}_1
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ -p_600 ∨ -b^{5, 121}_0
c  in DIMACS:
 8786  8787 -8788 -600 -8789 0
 8786  8787 -8788 -600  8790 0
 8786  8787 -8788 -600 -8791 0

c  2+1 --> break 
c    (-b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧  p_600) -> break
c  in CNF:
c     b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 8786 -8787  8788 -600 1162 0


c  2-1 --> 1
c    (-b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧ -p_600) -> (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0)
c  in CNF:
c     b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_2
c     b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_1
c     b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨  b^{5, 121}_0
c  in DIMACS:
 8786 -8787  8788  600 -8789 0
 8786 -8787  8788  600 -8790 0
 8786 -8787  8788  600  8791 0

c  1-1 --> 0
c    (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0 ∧ -p_600) -> (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧ -b^{5, 121}_0)
c  in CNF:
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_2
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_1
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_0
c  in DIMACS:
 8786  8787 -8788  600 -8789 0
 8786  8787 -8788  600 -8790 0
 8786  8787 -8788  600 -8791 0

c  0-1 --> -1
c    (-b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧ -p_600) -> ( b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0)
c  in CNF:
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨  b^{5, 121}_2
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_1
c     b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨  b^{5, 121}_0
c  in DIMACS:
 8786  8787  8788  600  8789 0
 8786  8787  8788  600 -8790 0
 8786  8787  8788  600  8791 0

c  -1-1 --> -2
c    ( b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧  b^{5, 120}_0 ∧ -p_600) -> ( b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0)
c  in CNF:
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨  b^{5, 121}_2
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨  b^{5, 121}_1
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨  p_600 ∨ -b^{5, 121}_0
c  in DIMACS:
-8786  8787 -8788  600  8789 0
-8786  8787 -8788  600  8790 0
-8786  8787 -8788  600 -8791 0

c  -2-1 --> break 
c    ( b^{5, 120}_2 ∧  b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨  b^{5, 120}_0 ∨  p_600 ∨ break
c  in DIMACS:
-8786 -8787  8788  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 120}_2 ∧ -b^{5, 120}_1 ∧ -b^{5, 120}_0 ∧ true) 
c  in CNF:
c    -b^{5, 120}_2 ∨  b^{5, 120}_1 ∨  b^{5, 120}_0 ∨ false 
c  in DIMACS:
-8786  8787  8788  0

c  3 does not represent an automaton state.
c    -(-b^{5, 120}_2 ∧  b^{5, 120}_1 ∧  b^{5, 120}_0 ∧ true) 
c  in CNF:
c     b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ false 
c  in DIMACS:
 8786 -8787 -8788  0
c  -3 does not represent an automaton state.
c    -( b^{5, 120}_2 ∧  b^{5, 120}_1 ∧  b^{5, 120}_0 ∧ true) 
c  in CNF:
c    -b^{5, 120}_2 ∨ -b^{5, 120}_1 ∨ -b^{5, 120}_0 ∨ false 
c  in DIMACS:
-8786 -8787 -8788  0

c i = 121
c  -2+1 --> -1
c    ( b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧  p_605) -> ( b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0)
c  in CNF:
c    -b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨  b^{5, 122}_2
c    -b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_1
c    -b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨  b^{5, 122}_0
c  in DIMACS:
-8789 -8790  8791 -605  8792 0
-8789 -8790  8791 -605 -8793 0
-8789 -8790  8791 -605  8794 0

c  -1+1 --> 0
c    ( b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0 ∧  p_605) -> (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧ -b^{5, 122}_0)
c  in CNF:
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_2
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_1
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_0
c  in DIMACS:
-8789  8790 -8791 -605 -8792 0
-8789  8790 -8791 -605 -8793 0
-8789  8790 -8791 -605 -8794 0

c  0+1 --> 1
c    (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧  p_605) -> (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0)
c  in CNF:
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_2
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_1
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨  b^{5, 122}_0
c  in DIMACS:
 8789  8790  8791 -605 -8792 0
 8789  8790  8791 -605 -8793 0
 8789  8790  8791 -605  8794 0

c  1+1 --> 2
c    (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0 ∧  p_605) -> (-b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0)
c  in CNF:
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_2
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨  b^{5, 122}_1
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ -p_605 ∨ -b^{5, 122}_0
c  in DIMACS:
 8789  8790 -8791 -605 -8792 0
 8789  8790 -8791 -605  8793 0
 8789  8790 -8791 -605 -8794 0

c  2+1 --> break 
c    (-b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧  p_605) -> break
c  in CNF:
c     b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ -p_605 ∨ break
c  in DIMACS:
 8789 -8790  8791 -605 1162 0


c  2-1 --> 1
c    (-b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧ -p_605) -> (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0)
c  in CNF:
c     b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_2
c     b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_1
c     b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨  b^{5, 122}_0
c  in DIMACS:
 8789 -8790  8791  605 -8792 0
 8789 -8790  8791  605 -8793 0
 8789 -8790  8791  605  8794 0

c  1-1 --> 0
c    (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0 ∧ -p_605) -> (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧ -b^{5, 122}_0)
c  in CNF:
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_2
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_1
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_0
c  in DIMACS:
 8789  8790 -8791  605 -8792 0
 8789  8790 -8791  605 -8793 0
 8789  8790 -8791  605 -8794 0

c  0-1 --> -1
c    (-b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧ -p_605) -> ( b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0)
c  in CNF:
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨  b^{5, 122}_2
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_1
c     b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨  b^{5, 122}_0
c  in DIMACS:
 8789  8790  8791  605  8792 0
 8789  8790  8791  605 -8793 0
 8789  8790  8791  605  8794 0

c  -1-1 --> -2
c    ( b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧  b^{5, 121}_0 ∧ -p_605) -> ( b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0)
c  in CNF:
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨  b^{5, 122}_2
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨  b^{5, 122}_1
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨  p_605 ∨ -b^{5, 122}_0
c  in DIMACS:
-8789  8790 -8791  605  8792 0
-8789  8790 -8791  605  8793 0
-8789  8790 -8791  605 -8794 0

c  -2-1 --> break 
c    ( b^{5, 121}_2 ∧  b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧ -p_605) -> break
c  in CNF:
c    -b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨  b^{5, 121}_0 ∨  p_605 ∨ break
c  in DIMACS:
-8789 -8790  8791  605 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 121}_2 ∧ -b^{5, 121}_1 ∧ -b^{5, 121}_0 ∧ true) 
c  in CNF:
c    -b^{5, 121}_2 ∨  b^{5, 121}_1 ∨  b^{5, 121}_0 ∨ false 
c  in DIMACS:
-8789  8790  8791  0

c  3 does not represent an automaton state.
c    -(-b^{5, 121}_2 ∧  b^{5, 121}_1 ∧  b^{5, 121}_0 ∧ true) 
c  in CNF:
c     b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ false 
c  in DIMACS:
 8789 -8790 -8791  0
c  -3 does not represent an automaton state.
c    -( b^{5, 121}_2 ∧  b^{5, 121}_1 ∧  b^{5, 121}_0 ∧ true) 
c  in CNF:
c    -b^{5, 121}_2 ∨ -b^{5, 121}_1 ∨ -b^{5, 121}_0 ∨ false 
c  in DIMACS:
-8789 -8790 -8791  0

c i = 122
c  -2+1 --> -1
c    ( b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧  p_610) -> ( b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0)
c  in CNF:
c    -b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨  b^{5, 123}_2
c    -b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_1
c    -b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨  b^{5, 123}_0
c  in DIMACS:
-8792 -8793  8794 -610  8795 0
-8792 -8793  8794 -610 -8796 0
-8792 -8793  8794 -610  8797 0

c  -1+1 --> 0
c    ( b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0 ∧  p_610) -> (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧ -b^{5, 123}_0)
c  in CNF:
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_2
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_1
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_0
c  in DIMACS:
-8792  8793 -8794 -610 -8795 0
-8792  8793 -8794 -610 -8796 0
-8792  8793 -8794 -610 -8797 0

c  0+1 --> 1
c    (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧  p_610) -> (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0)
c  in CNF:
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_2
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_1
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨  b^{5, 123}_0
c  in DIMACS:
 8792  8793  8794 -610 -8795 0
 8792  8793  8794 -610 -8796 0
 8792  8793  8794 -610  8797 0

c  1+1 --> 2
c    (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0 ∧  p_610) -> (-b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0)
c  in CNF:
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_2
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨  b^{5, 123}_1
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ -p_610 ∨ -b^{5, 123}_0
c  in DIMACS:
 8792  8793 -8794 -610 -8795 0
 8792  8793 -8794 -610  8796 0
 8792  8793 -8794 -610 -8797 0

c  2+1 --> break 
c    (-b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧  p_610) -> break
c  in CNF:
c     b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 8792 -8793  8794 -610 1162 0


c  2-1 --> 1
c    (-b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧ -p_610) -> (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0)
c  in CNF:
c     b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_2
c     b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_1
c     b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨  b^{5, 123}_0
c  in DIMACS:
 8792 -8793  8794  610 -8795 0
 8792 -8793  8794  610 -8796 0
 8792 -8793  8794  610  8797 0

c  1-1 --> 0
c    (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0 ∧ -p_610) -> (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧ -b^{5, 123}_0)
c  in CNF:
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_2
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_1
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_0
c  in DIMACS:
 8792  8793 -8794  610 -8795 0
 8792  8793 -8794  610 -8796 0
 8792  8793 -8794  610 -8797 0

c  0-1 --> -1
c    (-b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧ -p_610) -> ( b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0)
c  in CNF:
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨  b^{5, 123}_2
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_1
c     b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨  b^{5, 123}_0
c  in DIMACS:
 8792  8793  8794  610  8795 0
 8792  8793  8794  610 -8796 0
 8792  8793  8794  610  8797 0

c  -1-1 --> -2
c    ( b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧  b^{5, 122}_0 ∧ -p_610) -> ( b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0)
c  in CNF:
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨  b^{5, 123}_2
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨  b^{5, 123}_1
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨  p_610 ∨ -b^{5, 123}_0
c  in DIMACS:
-8792  8793 -8794  610  8795 0
-8792  8793 -8794  610  8796 0
-8792  8793 -8794  610 -8797 0

c  -2-1 --> break 
c    ( b^{5, 122}_2 ∧  b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨  b^{5, 122}_0 ∨  p_610 ∨ break
c  in DIMACS:
-8792 -8793  8794  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 122}_2 ∧ -b^{5, 122}_1 ∧ -b^{5, 122}_0 ∧ true) 
c  in CNF:
c    -b^{5, 122}_2 ∨  b^{5, 122}_1 ∨  b^{5, 122}_0 ∨ false 
c  in DIMACS:
-8792  8793  8794  0

c  3 does not represent an automaton state.
c    -(-b^{5, 122}_2 ∧  b^{5, 122}_1 ∧  b^{5, 122}_0 ∧ true) 
c  in CNF:
c     b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ false 
c  in DIMACS:
 8792 -8793 -8794  0
c  -3 does not represent an automaton state.
c    -( b^{5, 122}_2 ∧  b^{5, 122}_1 ∧  b^{5, 122}_0 ∧ true) 
c  in CNF:
c    -b^{5, 122}_2 ∨ -b^{5, 122}_1 ∨ -b^{5, 122}_0 ∨ false 
c  in DIMACS:
-8792 -8793 -8794  0

c i = 123
c  -2+1 --> -1
c    ( b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧  p_615) -> ( b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0)
c  in CNF:
c    -b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨  b^{5, 124}_2
c    -b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_1
c    -b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨  b^{5, 124}_0
c  in DIMACS:
-8795 -8796  8797 -615  8798 0
-8795 -8796  8797 -615 -8799 0
-8795 -8796  8797 -615  8800 0

c  -1+1 --> 0
c    ( b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0 ∧  p_615) -> (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧ -b^{5, 124}_0)
c  in CNF:
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_2
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_1
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_0
c  in DIMACS:
-8795  8796 -8797 -615 -8798 0
-8795  8796 -8797 -615 -8799 0
-8795  8796 -8797 -615 -8800 0

c  0+1 --> 1
c    (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧  p_615) -> (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0)
c  in CNF:
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_2
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_1
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨  b^{5, 124}_0
c  in DIMACS:
 8795  8796  8797 -615 -8798 0
 8795  8796  8797 -615 -8799 0
 8795  8796  8797 -615  8800 0

c  1+1 --> 2
c    (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0 ∧  p_615) -> (-b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0)
c  in CNF:
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_2
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨  b^{5, 124}_1
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ -p_615 ∨ -b^{5, 124}_0
c  in DIMACS:
 8795  8796 -8797 -615 -8798 0
 8795  8796 -8797 -615  8799 0
 8795  8796 -8797 -615 -8800 0

c  2+1 --> break 
c    (-b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧  p_615) -> break
c  in CNF:
c     b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 8795 -8796  8797 -615 1162 0


c  2-1 --> 1
c    (-b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧ -p_615) -> (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0)
c  in CNF:
c     b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_2
c     b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_1
c     b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨  b^{5, 124}_0
c  in DIMACS:
 8795 -8796  8797  615 -8798 0
 8795 -8796  8797  615 -8799 0
 8795 -8796  8797  615  8800 0

c  1-1 --> 0
c    (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0 ∧ -p_615) -> (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧ -b^{5, 124}_0)
c  in CNF:
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_2
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_1
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_0
c  in DIMACS:
 8795  8796 -8797  615 -8798 0
 8795  8796 -8797  615 -8799 0
 8795  8796 -8797  615 -8800 0

c  0-1 --> -1
c    (-b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧ -p_615) -> ( b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0)
c  in CNF:
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨  b^{5, 124}_2
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_1
c     b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨  b^{5, 124}_0
c  in DIMACS:
 8795  8796  8797  615  8798 0
 8795  8796  8797  615 -8799 0
 8795  8796  8797  615  8800 0

c  -1-1 --> -2
c    ( b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧  b^{5, 123}_0 ∧ -p_615) -> ( b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0)
c  in CNF:
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨  b^{5, 124}_2
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨  b^{5, 124}_1
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨  p_615 ∨ -b^{5, 124}_0
c  in DIMACS:
-8795  8796 -8797  615  8798 0
-8795  8796 -8797  615  8799 0
-8795  8796 -8797  615 -8800 0

c  -2-1 --> break 
c    ( b^{5, 123}_2 ∧  b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨  b^{5, 123}_0 ∨  p_615 ∨ break
c  in DIMACS:
-8795 -8796  8797  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 123}_2 ∧ -b^{5, 123}_1 ∧ -b^{5, 123}_0 ∧ true) 
c  in CNF:
c    -b^{5, 123}_2 ∨  b^{5, 123}_1 ∨  b^{5, 123}_0 ∨ false 
c  in DIMACS:
-8795  8796  8797  0

c  3 does not represent an automaton state.
c    -(-b^{5, 123}_2 ∧  b^{5, 123}_1 ∧  b^{5, 123}_0 ∧ true) 
c  in CNF:
c     b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ false 
c  in DIMACS:
 8795 -8796 -8797  0
c  -3 does not represent an automaton state.
c    -( b^{5, 123}_2 ∧  b^{5, 123}_1 ∧  b^{5, 123}_0 ∧ true) 
c  in CNF:
c    -b^{5, 123}_2 ∨ -b^{5, 123}_1 ∨ -b^{5, 123}_0 ∨ false 
c  in DIMACS:
-8795 -8796 -8797  0

c i = 124
c  -2+1 --> -1
c    ( b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧  p_620) -> ( b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0)
c  in CNF:
c    -b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨  b^{5, 125}_2
c    -b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_1
c    -b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨  b^{5, 125}_0
c  in DIMACS:
-8798 -8799  8800 -620  8801 0
-8798 -8799  8800 -620 -8802 0
-8798 -8799  8800 -620  8803 0

c  -1+1 --> 0
c    ( b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0 ∧  p_620) -> (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧ -b^{5, 125}_0)
c  in CNF:
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_2
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_1
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_0
c  in DIMACS:
-8798  8799 -8800 -620 -8801 0
-8798  8799 -8800 -620 -8802 0
-8798  8799 -8800 -620 -8803 0

c  0+1 --> 1
c    (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧  p_620) -> (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0)
c  in CNF:
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_2
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_1
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨  b^{5, 125}_0
c  in DIMACS:
 8798  8799  8800 -620 -8801 0
 8798  8799  8800 -620 -8802 0
 8798  8799  8800 -620  8803 0

c  1+1 --> 2
c    (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0 ∧  p_620) -> (-b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0)
c  in CNF:
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_2
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨  b^{5, 125}_1
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ -p_620 ∨ -b^{5, 125}_0
c  in DIMACS:
 8798  8799 -8800 -620 -8801 0
 8798  8799 -8800 -620  8802 0
 8798  8799 -8800 -620 -8803 0

c  2+1 --> break 
c    (-b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧  p_620) -> break
c  in CNF:
c     b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 8798 -8799  8800 -620 1162 0


c  2-1 --> 1
c    (-b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧ -p_620) -> (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0)
c  in CNF:
c     b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_2
c     b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_1
c     b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨  b^{5, 125}_0
c  in DIMACS:
 8798 -8799  8800  620 -8801 0
 8798 -8799  8800  620 -8802 0
 8798 -8799  8800  620  8803 0

c  1-1 --> 0
c    (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0 ∧ -p_620) -> (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧ -b^{5, 125}_0)
c  in CNF:
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_2
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_1
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_0
c  in DIMACS:
 8798  8799 -8800  620 -8801 0
 8798  8799 -8800  620 -8802 0
 8798  8799 -8800  620 -8803 0

c  0-1 --> -1
c    (-b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧ -p_620) -> ( b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0)
c  in CNF:
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨  b^{5, 125}_2
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_1
c     b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨  b^{5, 125}_0
c  in DIMACS:
 8798  8799  8800  620  8801 0
 8798  8799  8800  620 -8802 0
 8798  8799  8800  620  8803 0

c  -1-1 --> -2
c    ( b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧  b^{5, 124}_0 ∧ -p_620) -> ( b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0)
c  in CNF:
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨  b^{5, 125}_2
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨  b^{5, 125}_1
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨  p_620 ∨ -b^{5, 125}_0
c  in DIMACS:
-8798  8799 -8800  620  8801 0
-8798  8799 -8800  620  8802 0
-8798  8799 -8800  620 -8803 0

c  -2-1 --> break 
c    ( b^{5, 124}_2 ∧  b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨  b^{5, 124}_0 ∨  p_620 ∨ break
c  in DIMACS:
-8798 -8799  8800  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 124}_2 ∧ -b^{5, 124}_1 ∧ -b^{5, 124}_0 ∧ true) 
c  in CNF:
c    -b^{5, 124}_2 ∨  b^{5, 124}_1 ∨  b^{5, 124}_0 ∨ false 
c  in DIMACS:
-8798  8799  8800  0

c  3 does not represent an automaton state.
c    -(-b^{5, 124}_2 ∧  b^{5, 124}_1 ∧  b^{5, 124}_0 ∧ true) 
c  in CNF:
c     b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ false 
c  in DIMACS:
 8798 -8799 -8800  0
c  -3 does not represent an automaton state.
c    -( b^{5, 124}_2 ∧  b^{5, 124}_1 ∧  b^{5, 124}_0 ∧ true) 
c  in CNF:
c    -b^{5, 124}_2 ∨ -b^{5, 124}_1 ∨ -b^{5, 124}_0 ∨ false 
c  in DIMACS:
-8798 -8799 -8800  0

c i = 125
c  -2+1 --> -1
c    ( b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧  p_625) -> ( b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0)
c  in CNF:
c    -b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨  b^{5, 126}_2
c    -b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_1
c    -b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨  b^{5, 126}_0
c  in DIMACS:
-8801 -8802  8803 -625  8804 0
-8801 -8802  8803 -625 -8805 0
-8801 -8802  8803 -625  8806 0

c  -1+1 --> 0
c    ( b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0 ∧  p_625) -> (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧ -b^{5, 126}_0)
c  in CNF:
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_2
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_1
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_0
c  in DIMACS:
-8801  8802 -8803 -625 -8804 0
-8801  8802 -8803 -625 -8805 0
-8801  8802 -8803 -625 -8806 0

c  0+1 --> 1
c    (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧  p_625) -> (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0)
c  in CNF:
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_2
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_1
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨  b^{5, 126}_0
c  in DIMACS:
 8801  8802  8803 -625 -8804 0
 8801  8802  8803 -625 -8805 0
 8801  8802  8803 -625  8806 0

c  1+1 --> 2
c    (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0 ∧  p_625) -> (-b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0)
c  in CNF:
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_2
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨  b^{5, 126}_1
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ -p_625 ∨ -b^{5, 126}_0
c  in DIMACS:
 8801  8802 -8803 -625 -8804 0
 8801  8802 -8803 -625  8805 0
 8801  8802 -8803 -625 -8806 0

c  2+1 --> break 
c    (-b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧  p_625) -> break
c  in CNF:
c     b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ -p_625 ∨ break
c  in DIMACS:
 8801 -8802  8803 -625 1162 0


c  2-1 --> 1
c    (-b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧ -p_625) -> (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0)
c  in CNF:
c     b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_2
c     b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_1
c     b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨  b^{5, 126}_0
c  in DIMACS:
 8801 -8802  8803  625 -8804 0
 8801 -8802  8803  625 -8805 0
 8801 -8802  8803  625  8806 0

c  1-1 --> 0
c    (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0 ∧ -p_625) -> (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧ -b^{5, 126}_0)
c  in CNF:
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_2
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_1
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_0
c  in DIMACS:
 8801  8802 -8803  625 -8804 0
 8801  8802 -8803  625 -8805 0
 8801  8802 -8803  625 -8806 0

c  0-1 --> -1
c    (-b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧ -p_625) -> ( b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0)
c  in CNF:
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨  b^{5, 126}_2
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_1
c     b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨  b^{5, 126}_0
c  in DIMACS:
 8801  8802  8803  625  8804 0
 8801  8802  8803  625 -8805 0
 8801  8802  8803  625  8806 0

c  -1-1 --> -2
c    ( b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧  b^{5, 125}_0 ∧ -p_625) -> ( b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0)
c  in CNF:
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨  b^{5, 126}_2
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨  b^{5, 126}_1
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨  p_625 ∨ -b^{5, 126}_0
c  in DIMACS:
-8801  8802 -8803  625  8804 0
-8801  8802 -8803  625  8805 0
-8801  8802 -8803  625 -8806 0

c  -2-1 --> break 
c    ( b^{5, 125}_2 ∧  b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧ -p_625) -> break
c  in CNF:
c    -b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨  b^{5, 125}_0 ∨  p_625 ∨ break
c  in DIMACS:
-8801 -8802  8803  625 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 125}_2 ∧ -b^{5, 125}_1 ∧ -b^{5, 125}_0 ∧ true) 
c  in CNF:
c    -b^{5, 125}_2 ∨  b^{5, 125}_1 ∨  b^{5, 125}_0 ∨ false 
c  in DIMACS:
-8801  8802  8803  0

c  3 does not represent an automaton state.
c    -(-b^{5, 125}_2 ∧  b^{5, 125}_1 ∧  b^{5, 125}_0 ∧ true) 
c  in CNF:
c     b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ false 
c  in DIMACS:
 8801 -8802 -8803  0
c  -3 does not represent an automaton state.
c    -( b^{5, 125}_2 ∧  b^{5, 125}_1 ∧  b^{5, 125}_0 ∧ true) 
c  in CNF:
c    -b^{5, 125}_2 ∨ -b^{5, 125}_1 ∨ -b^{5, 125}_0 ∨ false 
c  in DIMACS:
-8801 -8802 -8803  0

c i = 126
c  -2+1 --> -1
c    ( b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧  p_630) -> ( b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0)
c  in CNF:
c    -b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨  b^{5, 127}_2
c    -b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_1
c    -b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨  b^{5, 127}_0
c  in DIMACS:
-8804 -8805  8806 -630  8807 0
-8804 -8805  8806 -630 -8808 0
-8804 -8805  8806 -630  8809 0

c  -1+1 --> 0
c    ( b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0 ∧  p_630) -> (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧ -b^{5, 127}_0)
c  in CNF:
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_2
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_1
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_0
c  in DIMACS:
-8804  8805 -8806 -630 -8807 0
-8804  8805 -8806 -630 -8808 0
-8804  8805 -8806 -630 -8809 0

c  0+1 --> 1
c    (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧  p_630) -> (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0)
c  in CNF:
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_2
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_1
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨  b^{5, 127}_0
c  in DIMACS:
 8804  8805  8806 -630 -8807 0
 8804  8805  8806 -630 -8808 0
 8804  8805  8806 -630  8809 0

c  1+1 --> 2
c    (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0 ∧  p_630) -> (-b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0)
c  in CNF:
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_2
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨  b^{5, 127}_1
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ -p_630 ∨ -b^{5, 127}_0
c  in DIMACS:
 8804  8805 -8806 -630 -8807 0
 8804  8805 -8806 -630  8808 0
 8804  8805 -8806 -630 -8809 0

c  2+1 --> break 
c    (-b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧  p_630) -> break
c  in CNF:
c     b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 8804 -8805  8806 -630 1162 0


c  2-1 --> 1
c    (-b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧ -p_630) -> (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0)
c  in CNF:
c     b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_2
c     b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_1
c     b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨  b^{5, 127}_0
c  in DIMACS:
 8804 -8805  8806  630 -8807 0
 8804 -8805  8806  630 -8808 0
 8804 -8805  8806  630  8809 0

c  1-1 --> 0
c    (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0 ∧ -p_630) -> (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧ -b^{5, 127}_0)
c  in CNF:
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_2
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_1
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_0
c  in DIMACS:
 8804  8805 -8806  630 -8807 0
 8804  8805 -8806  630 -8808 0
 8804  8805 -8806  630 -8809 0

c  0-1 --> -1
c    (-b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧ -p_630) -> ( b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0)
c  in CNF:
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨  b^{5, 127}_2
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_1
c     b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨  b^{5, 127}_0
c  in DIMACS:
 8804  8805  8806  630  8807 0
 8804  8805  8806  630 -8808 0
 8804  8805  8806  630  8809 0

c  -1-1 --> -2
c    ( b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧  b^{5, 126}_0 ∧ -p_630) -> ( b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0)
c  in CNF:
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨  b^{5, 127}_2
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨  b^{5, 127}_1
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨  p_630 ∨ -b^{5, 127}_0
c  in DIMACS:
-8804  8805 -8806  630  8807 0
-8804  8805 -8806  630  8808 0
-8804  8805 -8806  630 -8809 0

c  -2-1 --> break 
c    ( b^{5, 126}_2 ∧  b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨  b^{5, 126}_0 ∨  p_630 ∨ break
c  in DIMACS:
-8804 -8805  8806  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 126}_2 ∧ -b^{5, 126}_1 ∧ -b^{5, 126}_0 ∧ true) 
c  in CNF:
c    -b^{5, 126}_2 ∨  b^{5, 126}_1 ∨  b^{5, 126}_0 ∨ false 
c  in DIMACS:
-8804  8805  8806  0

c  3 does not represent an automaton state.
c    -(-b^{5, 126}_2 ∧  b^{5, 126}_1 ∧  b^{5, 126}_0 ∧ true) 
c  in CNF:
c     b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ false 
c  in DIMACS:
 8804 -8805 -8806  0
c  -3 does not represent an automaton state.
c    -( b^{5, 126}_2 ∧  b^{5, 126}_1 ∧  b^{5, 126}_0 ∧ true) 
c  in CNF:
c    -b^{5, 126}_2 ∨ -b^{5, 126}_1 ∨ -b^{5, 126}_0 ∨ false 
c  in DIMACS:
-8804 -8805 -8806  0

c i = 127
c  -2+1 --> -1
c    ( b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧  p_635) -> ( b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0)
c  in CNF:
c    -b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨  b^{5, 128}_2
c    -b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_1
c    -b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨  b^{5, 128}_0
c  in DIMACS:
-8807 -8808  8809 -635  8810 0
-8807 -8808  8809 -635 -8811 0
-8807 -8808  8809 -635  8812 0

c  -1+1 --> 0
c    ( b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0 ∧  p_635) -> (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧ -b^{5, 128}_0)
c  in CNF:
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_2
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_1
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_0
c  in DIMACS:
-8807  8808 -8809 -635 -8810 0
-8807  8808 -8809 -635 -8811 0
-8807  8808 -8809 -635 -8812 0

c  0+1 --> 1
c    (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧  p_635) -> (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0)
c  in CNF:
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_2
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_1
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨  b^{5, 128}_0
c  in DIMACS:
 8807  8808  8809 -635 -8810 0
 8807  8808  8809 -635 -8811 0
 8807  8808  8809 -635  8812 0

c  1+1 --> 2
c    (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0 ∧  p_635) -> (-b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0)
c  in CNF:
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_2
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨  b^{5, 128}_1
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ -p_635 ∨ -b^{5, 128}_0
c  in DIMACS:
 8807  8808 -8809 -635 -8810 0
 8807  8808 -8809 -635  8811 0
 8807  8808 -8809 -635 -8812 0

c  2+1 --> break 
c    (-b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧  p_635) -> break
c  in CNF:
c     b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ -p_635 ∨ break
c  in DIMACS:
 8807 -8808  8809 -635 1162 0


c  2-1 --> 1
c    (-b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧ -p_635) -> (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0)
c  in CNF:
c     b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_2
c     b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_1
c     b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨  b^{5, 128}_0
c  in DIMACS:
 8807 -8808  8809  635 -8810 0
 8807 -8808  8809  635 -8811 0
 8807 -8808  8809  635  8812 0

c  1-1 --> 0
c    (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0 ∧ -p_635) -> (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧ -b^{5, 128}_0)
c  in CNF:
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_2
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_1
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_0
c  in DIMACS:
 8807  8808 -8809  635 -8810 0
 8807  8808 -8809  635 -8811 0
 8807  8808 -8809  635 -8812 0

c  0-1 --> -1
c    (-b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧ -p_635) -> ( b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0)
c  in CNF:
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨  b^{5, 128}_2
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_1
c     b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨  b^{5, 128}_0
c  in DIMACS:
 8807  8808  8809  635  8810 0
 8807  8808  8809  635 -8811 0
 8807  8808  8809  635  8812 0

c  -1-1 --> -2
c    ( b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧  b^{5, 127}_0 ∧ -p_635) -> ( b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0)
c  in CNF:
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨  b^{5, 128}_2
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨  b^{5, 128}_1
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨  p_635 ∨ -b^{5, 128}_0
c  in DIMACS:
-8807  8808 -8809  635  8810 0
-8807  8808 -8809  635  8811 0
-8807  8808 -8809  635 -8812 0

c  -2-1 --> break 
c    ( b^{5, 127}_2 ∧  b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧ -p_635) -> break
c  in CNF:
c    -b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨  b^{5, 127}_0 ∨  p_635 ∨ break
c  in DIMACS:
-8807 -8808  8809  635 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 127}_2 ∧ -b^{5, 127}_1 ∧ -b^{5, 127}_0 ∧ true) 
c  in CNF:
c    -b^{5, 127}_2 ∨  b^{5, 127}_1 ∨  b^{5, 127}_0 ∨ false 
c  in DIMACS:
-8807  8808  8809  0

c  3 does not represent an automaton state.
c    -(-b^{5, 127}_2 ∧  b^{5, 127}_1 ∧  b^{5, 127}_0 ∧ true) 
c  in CNF:
c     b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ false 
c  in DIMACS:
 8807 -8808 -8809  0
c  -3 does not represent an automaton state.
c    -( b^{5, 127}_2 ∧  b^{5, 127}_1 ∧  b^{5, 127}_0 ∧ true) 
c  in CNF:
c    -b^{5, 127}_2 ∨ -b^{5, 127}_1 ∨ -b^{5, 127}_0 ∨ false 
c  in DIMACS:
-8807 -8808 -8809  0

c i = 128
c  -2+1 --> -1
c    ( b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧  p_640) -> ( b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0)
c  in CNF:
c    -b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨  b^{5, 129}_2
c    -b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_1
c    -b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨  b^{5, 129}_0
c  in DIMACS:
-8810 -8811  8812 -640  8813 0
-8810 -8811  8812 -640 -8814 0
-8810 -8811  8812 -640  8815 0

c  -1+1 --> 0
c    ( b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0 ∧  p_640) -> (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧ -b^{5, 129}_0)
c  in CNF:
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_2
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_1
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_0
c  in DIMACS:
-8810  8811 -8812 -640 -8813 0
-8810  8811 -8812 -640 -8814 0
-8810  8811 -8812 -640 -8815 0

c  0+1 --> 1
c    (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧  p_640) -> (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0)
c  in CNF:
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_2
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_1
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨  b^{5, 129}_0
c  in DIMACS:
 8810  8811  8812 -640 -8813 0
 8810  8811  8812 -640 -8814 0
 8810  8811  8812 -640  8815 0

c  1+1 --> 2
c    (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0 ∧  p_640) -> (-b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0)
c  in CNF:
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_2
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨  b^{5, 129}_1
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ -p_640 ∨ -b^{5, 129}_0
c  in DIMACS:
 8810  8811 -8812 -640 -8813 0
 8810  8811 -8812 -640  8814 0
 8810  8811 -8812 -640 -8815 0

c  2+1 --> break 
c    (-b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧  p_640) -> break
c  in CNF:
c     b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 8810 -8811  8812 -640 1162 0


c  2-1 --> 1
c    (-b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧ -p_640) -> (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0)
c  in CNF:
c     b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_2
c     b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_1
c     b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨  b^{5, 129}_0
c  in DIMACS:
 8810 -8811  8812  640 -8813 0
 8810 -8811  8812  640 -8814 0
 8810 -8811  8812  640  8815 0

c  1-1 --> 0
c    (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0 ∧ -p_640) -> (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧ -b^{5, 129}_0)
c  in CNF:
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_2
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_1
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_0
c  in DIMACS:
 8810  8811 -8812  640 -8813 0
 8810  8811 -8812  640 -8814 0
 8810  8811 -8812  640 -8815 0

c  0-1 --> -1
c    (-b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧ -p_640) -> ( b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0)
c  in CNF:
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨  b^{5, 129}_2
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_1
c     b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨  b^{5, 129}_0
c  in DIMACS:
 8810  8811  8812  640  8813 0
 8810  8811  8812  640 -8814 0
 8810  8811  8812  640  8815 0

c  -1-1 --> -2
c    ( b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧  b^{5, 128}_0 ∧ -p_640) -> ( b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0)
c  in CNF:
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨  b^{5, 129}_2
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨  b^{5, 129}_1
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨  p_640 ∨ -b^{5, 129}_0
c  in DIMACS:
-8810  8811 -8812  640  8813 0
-8810  8811 -8812  640  8814 0
-8810  8811 -8812  640 -8815 0

c  -2-1 --> break 
c    ( b^{5, 128}_2 ∧  b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨  b^{5, 128}_0 ∨  p_640 ∨ break
c  in DIMACS:
-8810 -8811  8812  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 128}_2 ∧ -b^{5, 128}_1 ∧ -b^{5, 128}_0 ∧ true) 
c  in CNF:
c    -b^{5, 128}_2 ∨  b^{5, 128}_1 ∨  b^{5, 128}_0 ∨ false 
c  in DIMACS:
-8810  8811  8812  0

c  3 does not represent an automaton state.
c    -(-b^{5, 128}_2 ∧  b^{5, 128}_1 ∧  b^{5, 128}_0 ∧ true) 
c  in CNF:
c     b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ false 
c  in DIMACS:
 8810 -8811 -8812  0
c  -3 does not represent an automaton state.
c    -( b^{5, 128}_2 ∧  b^{5, 128}_1 ∧  b^{5, 128}_0 ∧ true) 
c  in CNF:
c    -b^{5, 128}_2 ∨ -b^{5, 128}_1 ∨ -b^{5, 128}_0 ∨ false 
c  in DIMACS:
-8810 -8811 -8812  0

c i = 129
c  -2+1 --> -1
c    ( b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧  p_645) -> ( b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0)
c  in CNF:
c    -b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨  b^{5, 130}_2
c    -b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_1
c    -b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨  b^{5, 130}_0
c  in DIMACS:
-8813 -8814  8815 -645  8816 0
-8813 -8814  8815 -645 -8817 0
-8813 -8814  8815 -645  8818 0

c  -1+1 --> 0
c    ( b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0 ∧  p_645) -> (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧ -b^{5, 130}_0)
c  in CNF:
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_2
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_1
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_0
c  in DIMACS:
-8813  8814 -8815 -645 -8816 0
-8813  8814 -8815 -645 -8817 0
-8813  8814 -8815 -645 -8818 0

c  0+1 --> 1
c    (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧  p_645) -> (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0)
c  in CNF:
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_2
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_1
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨  b^{5, 130}_0
c  in DIMACS:
 8813  8814  8815 -645 -8816 0
 8813  8814  8815 -645 -8817 0
 8813  8814  8815 -645  8818 0

c  1+1 --> 2
c    (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0 ∧  p_645) -> (-b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0)
c  in CNF:
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_2
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨  b^{5, 130}_1
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ -p_645 ∨ -b^{5, 130}_0
c  in DIMACS:
 8813  8814 -8815 -645 -8816 0
 8813  8814 -8815 -645  8817 0
 8813  8814 -8815 -645 -8818 0

c  2+1 --> break 
c    (-b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧  p_645) -> break
c  in CNF:
c     b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 8813 -8814  8815 -645 1162 0


c  2-1 --> 1
c    (-b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧ -p_645) -> (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0)
c  in CNF:
c     b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_2
c     b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_1
c     b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨  b^{5, 130}_0
c  in DIMACS:
 8813 -8814  8815  645 -8816 0
 8813 -8814  8815  645 -8817 0
 8813 -8814  8815  645  8818 0

c  1-1 --> 0
c    (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0 ∧ -p_645) -> (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧ -b^{5, 130}_0)
c  in CNF:
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_2
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_1
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_0
c  in DIMACS:
 8813  8814 -8815  645 -8816 0
 8813  8814 -8815  645 -8817 0
 8813  8814 -8815  645 -8818 0

c  0-1 --> -1
c    (-b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧ -p_645) -> ( b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0)
c  in CNF:
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨  b^{5, 130}_2
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_1
c     b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨  b^{5, 130}_0
c  in DIMACS:
 8813  8814  8815  645  8816 0
 8813  8814  8815  645 -8817 0
 8813  8814  8815  645  8818 0

c  -1-1 --> -2
c    ( b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧  b^{5, 129}_0 ∧ -p_645) -> ( b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0)
c  in CNF:
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨  b^{5, 130}_2
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨  b^{5, 130}_1
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨  p_645 ∨ -b^{5, 130}_0
c  in DIMACS:
-8813  8814 -8815  645  8816 0
-8813  8814 -8815  645  8817 0
-8813  8814 -8815  645 -8818 0

c  -2-1 --> break 
c    ( b^{5, 129}_2 ∧  b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨  b^{5, 129}_0 ∨  p_645 ∨ break
c  in DIMACS:
-8813 -8814  8815  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 129}_2 ∧ -b^{5, 129}_1 ∧ -b^{5, 129}_0 ∧ true) 
c  in CNF:
c    -b^{5, 129}_2 ∨  b^{5, 129}_1 ∨  b^{5, 129}_0 ∨ false 
c  in DIMACS:
-8813  8814  8815  0

c  3 does not represent an automaton state.
c    -(-b^{5, 129}_2 ∧  b^{5, 129}_1 ∧  b^{5, 129}_0 ∧ true) 
c  in CNF:
c     b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ false 
c  in DIMACS:
 8813 -8814 -8815  0
c  -3 does not represent an automaton state.
c    -( b^{5, 129}_2 ∧  b^{5, 129}_1 ∧  b^{5, 129}_0 ∧ true) 
c  in CNF:
c    -b^{5, 129}_2 ∨ -b^{5, 129}_1 ∨ -b^{5, 129}_0 ∨ false 
c  in DIMACS:
-8813 -8814 -8815  0

c i = 130
c  -2+1 --> -1
c    ( b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧  p_650) -> ( b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0)
c  in CNF:
c    -b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨  b^{5, 131}_2
c    -b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_1
c    -b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨  b^{5, 131}_0
c  in DIMACS:
-8816 -8817  8818 -650  8819 0
-8816 -8817  8818 -650 -8820 0
-8816 -8817  8818 -650  8821 0

c  -1+1 --> 0
c    ( b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0 ∧  p_650) -> (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧ -b^{5, 131}_0)
c  in CNF:
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_2
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_1
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_0
c  in DIMACS:
-8816  8817 -8818 -650 -8819 0
-8816  8817 -8818 -650 -8820 0
-8816  8817 -8818 -650 -8821 0

c  0+1 --> 1
c    (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧  p_650) -> (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0)
c  in CNF:
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_2
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_1
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨  b^{5, 131}_0
c  in DIMACS:
 8816  8817  8818 -650 -8819 0
 8816  8817  8818 -650 -8820 0
 8816  8817  8818 -650  8821 0

c  1+1 --> 2
c    (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0 ∧  p_650) -> (-b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0)
c  in CNF:
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_2
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨  b^{5, 131}_1
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ -p_650 ∨ -b^{5, 131}_0
c  in DIMACS:
 8816  8817 -8818 -650 -8819 0
 8816  8817 -8818 -650  8820 0
 8816  8817 -8818 -650 -8821 0

c  2+1 --> break 
c    (-b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧  p_650) -> break
c  in CNF:
c     b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 8816 -8817  8818 -650 1162 0


c  2-1 --> 1
c    (-b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧ -p_650) -> (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0)
c  in CNF:
c     b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_2
c     b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_1
c     b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨  b^{5, 131}_0
c  in DIMACS:
 8816 -8817  8818  650 -8819 0
 8816 -8817  8818  650 -8820 0
 8816 -8817  8818  650  8821 0

c  1-1 --> 0
c    (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0 ∧ -p_650) -> (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧ -b^{5, 131}_0)
c  in CNF:
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_2
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_1
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_0
c  in DIMACS:
 8816  8817 -8818  650 -8819 0
 8816  8817 -8818  650 -8820 0
 8816  8817 -8818  650 -8821 0

c  0-1 --> -1
c    (-b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧ -p_650) -> ( b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0)
c  in CNF:
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨  b^{5, 131}_2
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_1
c     b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨  b^{5, 131}_0
c  in DIMACS:
 8816  8817  8818  650  8819 0
 8816  8817  8818  650 -8820 0
 8816  8817  8818  650  8821 0

c  -1-1 --> -2
c    ( b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧  b^{5, 130}_0 ∧ -p_650) -> ( b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0)
c  in CNF:
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨  b^{5, 131}_2
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨  b^{5, 131}_1
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨  p_650 ∨ -b^{5, 131}_0
c  in DIMACS:
-8816  8817 -8818  650  8819 0
-8816  8817 -8818  650  8820 0
-8816  8817 -8818  650 -8821 0

c  -2-1 --> break 
c    ( b^{5, 130}_2 ∧  b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨  b^{5, 130}_0 ∨  p_650 ∨ break
c  in DIMACS:
-8816 -8817  8818  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 130}_2 ∧ -b^{5, 130}_1 ∧ -b^{5, 130}_0 ∧ true) 
c  in CNF:
c    -b^{5, 130}_2 ∨  b^{5, 130}_1 ∨  b^{5, 130}_0 ∨ false 
c  in DIMACS:
-8816  8817  8818  0

c  3 does not represent an automaton state.
c    -(-b^{5, 130}_2 ∧  b^{5, 130}_1 ∧  b^{5, 130}_0 ∧ true) 
c  in CNF:
c     b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ false 
c  in DIMACS:
 8816 -8817 -8818  0
c  -3 does not represent an automaton state.
c    -( b^{5, 130}_2 ∧  b^{5, 130}_1 ∧  b^{5, 130}_0 ∧ true) 
c  in CNF:
c    -b^{5, 130}_2 ∨ -b^{5, 130}_1 ∨ -b^{5, 130}_0 ∨ false 
c  in DIMACS:
-8816 -8817 -8818  0

c i = 131
c  -2+1 --> -1
c    ( b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧  p_655) -> ( b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0)
c  in CNF:
c    -b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨  b^{5, 132}_2
c    -b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_1
c    -b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨  b^{5, 132}_0
c  in DIMACS:
-8819 -8820  8821 -655  8822 0
-8819 -8820  8821 -655 -8823 0
-8819 -8820  8821 -655  8824 0

c  -1+1 --> 0
c    ( b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0 ∧  p_655) -> (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧ -b^{5, 132}_0)
c  in CNF:
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_2
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_1
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_0
c  in DIMACS:
-8819  8820 -8821 -655 -8822 0
-8819  8820 -8821 -655 -8823 0
-8819  8820 -8821 -655 -8824 0

c  0+1 --> 1
c    (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧  p_655) -> (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0)
c  in CNF:
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_2
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_1
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨  b^{5, 132}_0
c  in DIMACS:
 8819  8820  8821 -655 -8822 0
 8819  8820  8821 -655 -8823 0
 8819  8820  8821 -655  8824 0

c  1+1 --> 2
c    (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0 ∧  p_655) -> (-b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0)
c  in CNF:
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_2
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨  b^{5, 132}_1
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ -p_655 ∨ -b^{5, 132}_0
c  in DIMACS:
 8819  8820 -8821 -655 -8822 0
 8819  8820 -8821 -655  8823 0
 8819  8820 -8821 -655 -8824 0

c  2+1 --> break 
c    (-b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧  p_655) -> break
c  in CNF:
c     b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ -p_655 ∨ break
c  in DIMACS:
 8819 -8820  8821 -655 1162 0


c  2-1 --> 1
c    (-b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧ -p_655) -> (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0)
c  in CNF:
c     b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_2
c     b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_1
c     b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨  b^{5, 132}_0
c  in DIMACS:
 8819 -8820  8821  655 -8822 0
 8819 -8820  8821  655 -8823 0
 8819 -8820  8821  655  8824 0

c  1-1 --> 0
c    (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0 ∧ -p_655) -> (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧ -b^{5, 132}_0)
c  in CNF:
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_2
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_1
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_0
c  in DIMACS:
 8819  8820 -8821  655 -8822 0
 8819  8820 -8821  655 -8823 0
 8819  8820 -8821  655 -8824 0

c  0-1 --> -1
c    (-b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧ -p_655) -> ( b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0)
c  in CNF:
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨  b^{5, 132}_2
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_1
c     b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨  b^{5, 132}_0
c  in DIMACS:
 8819  8820  8821  655  8822 0
 8819  8820  8821  655 -8823 0
 8819  8820  8821  655  8824 0

c  -1-1 --> -2
c    ( b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧  b^{5, 131}_0 ∧ -p_655) -> ( b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0)
c  in CNF:
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨  b^{5, 132}_2
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨  b^{5, 132}_1
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨  p_655 ∨ -b^{5, 132}_0
c  in DIMACS:
-8819  8820 -8821  655  8822 0
-8819  8820 -8821  655  8823 0
-8819  8820 -8821  655 -8824 0

c  -2-1 --> break 
c    ( b^{5, 131}_2 ∧  b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧ -p_655) -> break
c  in CNF:
c    -b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨  b^{5, 131}_0 ∨  p_655 ∨ break
c  in DIMACS:
-8819 -8820  8821  655 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 131}_2 ∧ -b^{5, 131}_1 ∧ -b^{5, 131}_0 ∧ true) 
c  in CNF:
c    -b^{5, 131}_2 ∨  b^{5, 131}_1 ∨  b^{5, 131}_0 ∨ false 
c  in DIMACS:
-8819  8820  8821  0

c  3 does not represent an automaton state.
c    -(-b^{5, 131}_2 ∧  b^{5, 131}_1 ∧  b^{5, 131}_0 ∧ true) 
c  in CNF:
c     b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ false 
c  in DIMACS:
 8819 -8820 -8821  0
c  -3 does not represent an automaton state.
c    -( b^{5, 131}_2 ∧  b^{5, 131}_1 ∧  b^{5, 131}_0 ∧ true) 
c  in CNF:
c    -b^{5, 131}_2 ∨ -b^{5, 131}_1 ∨ -b^{5, 131}_0 ∨ false 
c  in DIMACS:
-8819 -8820 -8821  0

c i = 132
c  -2+1 --> -1
c    ( b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧  p_660) -> ( b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0)
c  in CNF:
c    -b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨  b^{5, 133}_2
c    -b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_1
c    -b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨  b^{5, 133}_0
c  in DIMACS:
-8822 -8823  8824 -660  8825 0
-8822 -8823  8824 -660 -8826 0
-8822 -8823  8824 -660  8827 0

c  -1+1 --> 0
c    ( b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0 ∧  p_660) -> (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧ -b^{5, 133}_0)
c  in CNF:
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_2
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_1
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_0
c  in DIMACS:
-8822  8823 -8824 -660 -8825 0
-8822  8823 -8824 -660 -8826 0
-8822  8823 -8824 -660 -8827 0

c  0+1 --> 1
c    (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧  p_660) -> (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0)
c  in CNF:
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_2
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_1
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨  b^{5, 133}_0
c  in DIMACS:
 8822  8823  8824 -660 -8825 0
 8822  8823  8824 -660 -8826 0
 8822  8823  8824 -660  8827 0

c  1+1 --> 2
c    (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0 ∧  p_660) -> (-b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0)
c  in CNF:
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_2
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨  b^{5, 133}_1
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ -p_660 ∨ -b^{5, 133}_0
c  in DIMACS:
 8822  8823 -8824 -660 -8825 0
 8822  8823 -8824 -660  8826 0
 8822  8823 -8824 -660 -8827 0

c  2+1 --> break 
c    (-b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧  p_660) -> break
c  in CNF:
c     b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 8822 -8823  8824 -660 1162 0


c  2-1 --> 1
c    (-b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧ -p_660) -> (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0)
c  in CNF:
c     b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_2
c     b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_1
c     b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨  b^{5, 133}_0
c  in DIMACS:
 8822 -8823  8824  660 -8825 0
 8822 -8823  8824  660 -8826 0
 8822 -8823  8824  660  8827 0

c  1-1 --> 0
c    (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0 ∧ -p_660) -> (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧ -b^{5, 133}_0)
c  in CNF:
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_2
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_1
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_0
c  in DIMACS:
 8822  8823 -8824  660 -8825 0
 8822  8823 -8824  660 -8826 0
 8822  8823 -8824  660 -8827 0

c  0-1 --> -1
c    (-b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧ -p_660) -> ( b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0)
c  in CNF:
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨  b^{5, 133}_2
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_1
c     b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨  b^{5, 133}_0
c  in DIMACS:
 8822  8823  8824  660  8825 0
 8822  8823  8824  660 -8826 0
 8822  8823  8824  660  8827 0

c  -1-1 --> -2
c    ( b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧  b^{5, 132}_0 ∧ -p_660) -> ( b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0)
c  in CNF:
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨  b^{5, 133}_2
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨  b^{5, 133}_1
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨  p_660 ∨ -b^{5, 133}_0
c  in DIMACS:
-8822  8823 -8824  660  8825 0
-8822  8823 -8824  660  8826 0
-8822  8823 -8824  660 -8827 0

c  -2-1 --> break 
c    ( b^{5, 132}_2 ∧  b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨  b^{5, 132}_0 ∨  p_660 ∨ break
c  in DIMACS:
-8822 -8823  8824  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 132}_2 ∧ -b^{5, 132}_1 ∧ -b^{5, 132}_0 ∧ true) 
c  in CNF:
c    -b^{5, 132}_2 ∨  b^{5, 132}_1 ∨  b^{5, 132}_0 ∨ false 
c  in DIMACS:
-8822  8823  8824  0

c  3 does not represent an automaton state.
c    -(-b^{5, 132}_2 ∧  b^{5, 132}_1 ∧  b^{5, 132}_0 ∧ true) 
c  in CNF:
c     b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ false 
c  in DIMACS:
 8822 -8823 -8824  0
c  -3 does not represent an automaton state.
c    -( b^{5, 132}_2 ∧  b^{5, 132}_1 ∧  b^{5, 132}_0 ∧ true) 
c  in CNF:
c    -b^{5, 132}_2 ∨ -b^{5, 132}_1 ∨ -b^{5, 132}_0 ∨ false 
c  in DIMACS:
-8822 -8823 -8824  0

c i = 133
c  -2+1 --> -1
c    ( b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧  p_665) -> ( b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0)
c  in CNF:
c    -b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨  b^{5, 134}_2
c    -b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_1
c    -b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨  b^{5, 134}_0
c  in DIMACS:
-8825 -8826  8827 -665  8828 0
-8825 -8826  8827 -665 -8829 0
-8825 -8826  8827 -665  8830 0

c  -1+1 --> 0
c    ( b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0 ∧  p_665) -> (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧ -b^{5, 134}_0)
c  in CNF:
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_2
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_1
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_0
c  in DIMACS:
-8825  8826 -8827 -665 -8828 0
-8825  8826 -8827 -665 -8829 0
-8825  8826 -8827 -665 -8830 0

c  0+1 --> 1
c    (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧  p_665) -> (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0)
c  in CNF:
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_2
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_1
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨  b^{5, 134}_0
c  in DIMACS:
 8825  8826  8827 -665 -8828 0
 8825  8826  8827 -665 -8829 0
 8825  8826  8827 -665  8830 0

c  1+1 --> 2
c    (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0 ∧  p_665) -> (-b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0)
c  in CNF:
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_2
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨  b^{5, 134}_1
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ -p_665 ∨ -b^{5, 134}_0
c  in DIMACS:
 8825  8826 -8827 -665 -8828 0
 8825  8826 -8827 -665  8829 0
 8825  8826 -8827 -665 -8830 0

c  2+1 --> break 
c    (-b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧  p_665) -> break
c  in CNF:
c     b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 8825 -8826  8827 -665 1162 0


c  2-1 --> 1
c    (-b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧ -p_665) -> (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0)
c  in CNF:
c     b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_2
c     b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_1
c     b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨  b^{5, 134}_0
c  in DIMACS:
 8825 -8826  8827  665 -8828 0
 8825 -8826  8827  665 -8829 0
 8825 -8826  8827  665  8830 0

c  1-1 --> 0
c    (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0 ∧ -p_665) -> (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧ -b^{5, 134}_0)
c  in CNF:
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_2
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_1
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_0
c  in DIMACS:
 8825  8826 -8827  665 -8828 0
 8825  8826 -8827  665 -8829 0
 8825  8826 -8827  665 -8830 0

c  0-1 --> -1
c    (-b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧ -p_665) -> ( b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0)
c  in CNF:
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨  b^{5, 134}_2
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_1
c     b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨  b^{5, 134}_0
c  in DIMACS:
 8825  8826  8827  665  8828 0
 8825  8826  8827  665 -8829 0
 8825  8826  8827  665  8830 0

c  -1-1 --> -2
c    ( b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧  b^{5, 133}_0 ∧ -p_665) -> ( b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0)
c  in CNF:
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨  b^{5, 134}_2
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨  b^{5, 134}_1
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨  p_665 ∨ -b^{5, 134}_0
c  in DIMACS:
-8825  8826 -8827  665  8828 0
-8825  8826 -8827  665  8829 0
-8825  8826 -8827  665 -8830 0

c  -2-1 --> break 
c    ( b^{5, 133}_2 ∧  b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨  b^{5, 133}_0 ∨  p_665 ∨ break
c  in DIMACS:
-8825 -8826  8827  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 133}_2 ∧ -b^{5, 133}_1 ∧ -b^{5, 133}_0 ∧ true) 
c  in CNF:
c    -b^{5, 133}_2 ∨  b^{5, 133}_1 ∨  b^{5, 133}_0 ∨ false 
c  in DIMACS:
-8825  8826  8827  0

c  3 does not represent an automaton state.
c    -(-b^{5, 133}_2 ∧  b^{5, 133}_1 ∧  b^{5, 133}_0 ∧ true) 
c  in CNF:
c     b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ false 
c  in DIMACS:
 8825 -8826 -8827  0
c  -3 does not represent an automaton state.
c    -( b^{5, 133}_2 ∧  b^{5, 133}_1 ∧  b^{5, 133}_0 ∧ true) 
c  in CNF:
c    -b^{5, 133}_2 ∨ -b^{5, 133}_1 ∨ -b^{5, 133}_0 ∨ false 
c  in DIMACS:
-8825 -8826 -8827  0

c i = 134
c  -2+1 --> -1
c    ( b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧  p_670) -> ( b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0)
c  in CNF:
c    -b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨  b^{5, 135}_2
c    -b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_1
c    -b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨  b^{5, 135}_0
c  in DIMACS:
-8828 -8829  8830 -670  8831 0
-8828 -8829  8830 -670 -8832 0
-8828 -8829  8830 -670  8833 0

c  -1+1 --> 0
c    ( b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0 ∧  p_670) -> (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧ -b^{5, 135}_0)
c  in CNF:
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_2
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_1
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_0
c  in DIMACS:
-8828  8829 -8830 -670 -8831 0
-8828  8829 -8830 -670 -8832 0
-8828  8829 -8830 -670 -8833 0

c  0+1 --> 1
c    (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧  p_670) -> (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0)
c  in CNF:
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_2
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_1
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨  b^{5, 135}_0
c  in DIMACS:
 8828  8829  8830 -670 -8831 0
 8828  8829  8830 -670 -8832 0
 8828  8829  8830 -670  8833 0

c  1+1 --> 2
c    (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0 ∧  p_670) -> (-b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0)
c  in CNF:
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_2
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨  b^{5, 135}_1
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ -p_670 ∨ -b^{5, 135}_0
c  in DIMACS:
 8828  8829 -8830 -670 -8831 0
 8828  8829 -8830 -670  8832 0
 8828  8829 -8830 -670 -8833 0

c  2+1 --> break 
c    (-b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧  p_670) -> break
c  in CNF:
c     b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 8828 -8829  8830 -670 1162 0


c  2-1 --> 1
c    (-b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧ -p_670) -> (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0)
c  in CNF:
c     b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_2
c     b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_1
c     b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨  b^{5, 135}_0
c  in DIMACS:
 8828 -8829  8830  670 -8831 0
 8828 -8829  8830  670 -8832 0
 8828 -8829  8830  670  8833 0

c  1-1 --> 0
c    (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0 ∧ -p_670) -> (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧ -b^{5, 135}_0)
c  in CNF:
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_2
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_1
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_0
c  in DIMACS:
 8828  8829 -8830  670 -8831 0
 8828  8829 -8830  670 -8832 0
 8828  8829 -8830  670 -8833 0

c  0-1 --> -1
c    (-b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧ -p_670) -> ( b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0)
c  in CNF:
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨  b^{5, 135}_2
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_1
c     b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨  b^{5, 135}_0
c  in DIMACS:
 8828  8829  8830  670  8831 0
 8828  8829  8830  670 -8832 0
 8828  8829  8830  670  8833 0

c  -1-1 --> -2
c    ( b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧  b^{5, 134}_0 ∧ -p_670) -> ( b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0)
c  in CNF:
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨  b^{5, 135}_2
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨  b^{5, 135}_1
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨  p_670 ∨ -b^{5, 135}_0
c  in DIMACS:
-8828  8829 -8830  670  8831 0
-8828  8829 -8830  670  8832 0
-8828  8829 -8830  670 -8833 0

c  -2-1 --> break 
c    ( b^{5, 134}_2 ∧  b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨  b^{5, 134}_0 ∨  p_670 ∨ break
c  in DIMACS:
-8828 -8829  8830  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 134}_2 ∧ -b^{5, 134}_1 ∧ -b^{5, 134}_0 ∧ true) 
c  in CNF:
c    -b^{5, 134}_2 ∨  b^{5, 134}_1 ∨  b^{5, 134}_0 ∨ false 
c  in DIMACS:
-8828  8829  8830  0

c  3 does not represent an automaton state.
c    -(-b^{5, 134}_2 ∧  b^{5, 134}_1 ∧  b^{5, 134}_0 ∧ true) 
c  in CNF:
c     b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ false 
c  in DIMACS:
 8828 -8829 -8830  0
c  -3 does not represent an automaton state.
c    -( b^{5, 134}_2 ∧  b^{5, 134}_1 ∧  b^{5, 134}_0 ∧ true) 
c  in CNF:
c    -b^{5, 134}_2 ∨ -b^{5, 134}_1 ∨ -b^{5, 134}_0 ∨ false 
c  in DIMACS:
-8828 -8829 -8830  0

c i = 135
c  -2+1 --> -1
c    ( b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧  p_675) -> ( b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0)
c  in CNF:
c    -b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨  b^{5, 136}_2
c    -b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_1
c    -b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨  b^{5, 136}_0
c  in DIMACS:
-8831 -8832  8833 -675  8834 0
-8831 -8832  8833 -675 -8835 0
-8831 -8832  8833 -675  8836 0

c  -1+1 --> 0
c    ( b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0 ∧  p_675) -> (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧ -b^{5, 136}_0)
c  in CNF:
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_2
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_1
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_0
c  in DIMACS:
-8831  8832 -8833 -675 -8834 0
-8831  8832 -8833 -675 -8835 0
-8831  8832 -8833 -675 -8836 0

c  0+1 --> 1
c    (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧  p_675) -> (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0)
c  in CNF:
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_2
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_1
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨  b^{5, 136}_0
c  in DIMACS:
 8831  8832  8833 -675 -8834 0
 8831  8832  8833 -675 -8835 0
 8831  8832  8833 -675  8836 0

c  1+1 --> 2
c    (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0 ∧  p_675) -> (-b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0)
c  in CNF:
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_2
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨  b^{5, 136}_1
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ -p_675 ∨ -b^{5, 136}_0
c  in DIMACS:
 8831  8832 -8833 -675 -8834 0
 8831  8832 -8833 -675  8835 0
 8831  8832 -8833 -675 -8836 0

c  2+1 --> break 
c    (-b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧  p_675) -> break
c  in CNF:
c     b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 8831 -8832  8833 -675 1162 0


c  2-1 --> 1
c    (-b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧ -p_675) -> (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0)
c  in CNF:
c     b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_2
c     b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_1
c     b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨  b^{5, 136}_0
c  in DIMACS:
 8831 -8832  8833  675 -8834 0
 8831 -8832  8833  675 -8835 0
 8831 -8832  8833  675  8836 0

c  1-1 --> 0
c    (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0 ∧ -p_675) -> (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧ -b^{5, 136}_0)
c  in CNF:
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_2
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_1
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_0
c  in DIMACS:
 8831  8832 -8833  675 -8834 0
 8831  8832 -8833  675 -8835 0
 8831  8832 -8833  675 -8836 0

c  0-1 --> -1
c    (-b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧ -p_675) -> ( b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0)
c  in CNF:
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨  b^{5, 136}_2
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_1
c     b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨  b^{5, 136}_0
c  in DIMACS:
 8831  8832  8833  675  8834 0
 8831  8832  8833  675 -8835 0
 8831  8832  8833  675  8836 0

c  -1-1 --> -2
c    ( b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧  b^{5, 135}_0 ∧ -p_675) -> ( b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0)
c  in CNF:
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨  b^{5, 136}_2
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨  b^{5, 136}_1
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨  p_675 ∨ -b^{5, 136}_0
c  in DIMACS:
-8831  8832 -8833  675  8834 0
-8831  8832 -8833  675  8835 0
-8831  8832 -8833  675 -8836 0

c  -2-1 --> break 
c    ( b^{5, 135}_2 ∧  b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨  b^{5, 135}_0 ∨  p_675 ∨ break
c  in DIMACS:
-8831 -8832  8833  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 135}_2 ∧ -b^{5, 135}_1 ∧ -b^{5, 135}_0 ∧ true) 
c  in CNF:
c    -b^{5, 135}_2 ∨  b^{5, 135}_1 ∨  b^{5, 135}_0 ∨ false 
c  in DIMACS:
-8831  8832  8833  0

c  3 does not represent an automaton state.
c    -(-b^{5, 135}_2 ∧  b^{5, 135}_1 ∧  b^{5, 135}_0 ∧ true) 
c  in CNF:
c     b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ false 
c  in DIMACS:
 8831 -8832 -8833  0
c  -3 does not represent an automaton state.
c    -( b^{5, 135}_2 ∧  b^{5, 135}_1 ∧  b^{5, 135}_0 ∧ true) 
c  in CNF:
c    -b^{5, 135}_2 ∨ -b^{5, 135}_1 ∨ -b^{5, 135}_0 ∨ false 
c  in DIMACS:
-8831 -8832 -8833  0

c i = 136
c  -2+1 --> -1
c    ( b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧  p_680) -> ( b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0)
c  in CNF:
c    -b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨  b^{5, 137}_2
c    -b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_1
c    -b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨  b^{5, 137}_0
c  in DIMACS:
-8834 -8835  8836 -680  8837 0
-8834 -8835  8836 -680 -8838 0
-8834 -8835  8836 -680  8839 0

c  -1+1 --> 0
c    ( b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0 ∧  p_680) -> (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧ -b^{5, 137}_0)
c  in CNF:
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_2
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_1
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_0
c  in DIMACS:
-8834  8835 -8836 -680 -8837 0
-8834  8835 -8836 -680 -8838 0
-8834  8835 -8836 -680 -8839 0

c  0+1 --> 1
c    (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧  p_680) -> (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0)
c  in CNF:
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_2
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_1
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨  b^{5, 137}_0
c  in DIMACS:
 8834  8835  8836 -680 -8837 0
 8834  8835  8836 -680 -8838 0
 8834  8835  8836 -680  8839 0

c  1+1 --> 2
c    (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0 ∧  p_680) -> (-b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0)
c  in CNF:
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_2
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨  b^{5, 137}_1
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ -p_680 ∨ -b^{5, 137}_0
c  in DIMACS:
 8834  8835 -8836 -680 -8837 0
 8834  8835 -8836 -680  8838 0
 8834  8835 -8836 -680 -8839 0

c  2+1 --> break 
c    (-b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧  p_680) -> break
c  in CNF:
c     b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 8834 -8835  8836 -680 1162 0


c  2-1 --> 1
c    (-b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧ -p_680) -> (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0)
c  in CNF:
c     b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_2
c     b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_1
c     b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨  b^{5, 137}_0
c  in DIMACS:
 8834 -8835  8836  680 -8837 0
 8834 -8835  8836  680 -8838 0
 8834 -8835  8836  680  8839 0

c  1-1 --> 0
c    (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0 ∧ -p_680) -> (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧ -b^{5, 137}_0)
c  in CNF:
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_2
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_1
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_0
c  in DIMACS:
 8834  8835 -8836  680 -8837 0
 8834  8835 -8836  680 -8838 0
 8834  8835 -8836  680 -8839 0

c  0-1 --> -1
c    (-b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧ -p_680) -> ( b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0)
c  in CNF:
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨  b^{5, 137}_2
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_1
c     b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨  b^{5, 137}_0
c  in DIMACS:
 8834  8835  8836  680  8837 0
 8834  8835  8836  680 -8838 0
 8834  8835  8836  680  8839 0

c  -1-1 --> -2
c    ( b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧  b^{5, 136}_0 ∧ -p_680) -> ( b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0)
c  in CNF:
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨  b^{5, 137}_2
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨  b^{5, 137}_1
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨  p_680 ∨ -b^{5, 137}_0
c  in DIMACS:
-8834  8835 -8836  680  8837 0
-8834  8835 -8836  680  8838 0
-8834  8835 -8836  680 -8839 0

c  -2-1 --> break 
c    ( b^{5, 136}_2 ∧  b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨  b^{5, 136}_0 ∨  p_680 ∨ break
c  in DIMACS:
-8834 -8835  8836  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 136}_2 ∧ -b^{5, 136}_1 ∧ -b^{5, 136}_0 ∧ true) 
c  in CNF:
c    -b^{5, 136}_2 ∨  b^{5, 136}_1 ∨  b^{5, 136}_0 ∨ false 
c  in DIMACS:
-8834  8835  8836  0

c  3 does not represent an automaton state.
c    -(-b^{5, 136}_2 ∧  b^{5, 136}_1 ∧  b^{5, 136}_0 ∧ true) 
c  in CNF:
c     b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ false 
c  in DIMACS:
 8834 -8835 -8836  0
c  -3 does not represent an automaton state.
c    -( b^{5, 136}_2 ∧  b^{5, 136}_1 ∧  b^{5, 136}_0 ∧ true) 
c  in CNF:
c    -b^{5, 136}_2 ∨ -b^{5, 136}_1 ∨ -b^{5, 136}_0 ∨ false 
c  in DIMACS:
-8834 -8835 -8836  0

c i = 137
c  -2+1 --> -1
c    ( b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧  p_685) -> ( b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0)
c  in CNF:
c    -b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨  b^{5, 138}_2
c    -b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_1
c    -b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨  b^{5, 138}_0
c  in DIMACS:
-8837 -8838  8839 -685  8840 0
-8837 -8838  8839 -685 -8841 0
-8837 -8838  8839 -685  8842 0

c  -1+1 --> 0
c    ( b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0 ∧  p_685) -> (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧ -b^{5, 138}_0)
c  in CNF:
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_2
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_1
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_0
c  in DIMACS:
-8837  8838 -8839 -685 -8840 0
-8837  8838 -8839 -685 -8841 0
-8837  8838 -8839 -685 -8842 0

c  0+1 --> 1
c    (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧  p_685) -> (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0)
c  in CNF:
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_2
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_1
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨  b^{5, 138}_0
c  in DIMACS:
 8837  8838  8839 -685 -8840 0
 8837  8838  8839 -685 -8841 0
 8837  8838  8839 -685  8842 0

c  1+1 --> 2
c    (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0 ∧  p_685) -> (-b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0)
c  in CNF:
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_2
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨  b^{5, 138}_1
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ -p_685 ∨ -b^{5, 138}_0
c  in DIMACS:
 8837  8838 -8839 -685 -8840 0
 8837  8838 -8839 -685  8841 0
 8837  8838 -8839 -685 -8842 0

c  2+1 --> break 
c    (-b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧  p_685) -> break
c  in CNF:
c     b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ -p_685 ∨ break
c  in DIMACS:
 8837 -8838  8839 -685 1162 0


c  2-1 --> 1
c    (-b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧ -p_685) -> (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0)
c  in CNF:
c     b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_2
c     b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_1
c     b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨  b^{5, 138}_0
c  in DIMACS:
 8837 -8838  8839  685 -8840 0
 8837 -8838  8839  685 -8841 0
 8837 -8838  8839  685  8842 0

c  1-1 --> 0
c    (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0 ∧ -p_685) -> (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧ -b^{5, 138}_0)
c  in CNF:
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_2
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_1
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_0
c  in DIMACS:
 8837  8838 -8839  685 -8840 0
 8837  8838 -8839  685 -8841 0
 8837  8838 -8839  685 -8842 0

c  0-1 --> -1
c    (-b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧ -p_685) -> ( b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0)
c  in CNF:
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨  b^{5, 138}_2
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_1
c     b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨  b^{5, 138}_0
c  in DIMACS:
 8837  8838  8839  685  8840 0
 8837  8838  8839  685 -8841 0
 8837  8838  8839  685  8842 0

c  -1-1 --> -2
c    ( b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧  b^{5, 137}_0 ∧ -p_685) -> ( b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0)
c  in CNF:
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨  b^{5, 138}_2
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨  b^{5, 138}_1
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨  p_685 ∨ -b^{5, 138}_0
c  in DIMACS:
-8837  8838 -8839  685  8840 0
-8837  8838 -8839  685  8841 0
-8837  8838 -8839  685 -8842 0

c  -2-1 --> break 
c    ( b^{5, 137}_2 ∧  b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧ -p_685) -> break
c  in CNF:
c    -b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨  b^{5, 137}_0 ∨  p_685 ∨ break
c  in DIMACS:
-8837 -8838  8839  685 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 137}_2 ∧ -b^{5, 137}_1 ∧ -b^{5, 137}_0 ∧ true) 
c  in CNF:
c    -b^{5, 137}_2 ∨  b^{5, 137}_1 ∨  b^{5, 137}_0 ∨ false 
c  in DIMACS:
-8837  8838  8839  0

c  3 does not represent an automaton state.
c    -(-b^{5, 137}_2 ∧  b^{5, 137}_1 ∧  b^{5, 137}_0 ∧ true) 
c  in CNF:
c     b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ false 
c  in DIMACS:
 8837 -8838 -8839  0
c  -3 does not represent an automaton state.
c    -( b^{5, 137}_2 ∧  b^{5, 137}_1 ∧  b^{5, 137}_0 ∧ true) 
c  in CNF:
c    -b^{5, 137}_2 ∨ -b^{5, 137}_1 ∨ -b^{5, 137}_0 ∨ false 
c  in DIMACS:
-8837 -8838 -8839  0

c i = 138
c  -2+1 --> -1
c    ( b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧  p_690) -> ( b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0)
c  in CNF:
c    -b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨  b^{5, 139}_2
c    -b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_1
c    -b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨  b^{5, 139}_0
c  in DIMACS:
-8840 -8841  8842 -690  8843 0
-8840 -8841  8842 -690 -8844 0
-8840 -8841  8842 -690  8845 0

c  -1+1 --> 0
c    ( b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0 ∧  p_690) -> (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧ -b^{5, 139}_0)
c  in CNF:
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_2
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_1
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_0
c  in DIMACS:
-8840  8841 -8842 -690 -8843 0
-8840  8841 -8842 -690 -8844 0
-8840  8841 -8842 -690 -8845 0

c  0+1 --> 1
c    (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧  p_690) -> (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0)
c  in CNF:
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_2
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_1
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨  b^{5, 139}_0
c  in DIMACS:
 8840  8841  8842 -690 -8843 0
 8840  8841  8842 -690 -8844 0
 8840  8841  8842 -690  8845 0

c  1+1 --> 2
c    (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0 ∧  p_690) -> (-b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0)
c  in CNF:
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_2
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨  b^{5, 139}_1
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ -p_690 ∨ -b^{5, 139}_0
c  in DIMACS:
 8840  8841 -8842 -690 -8843 0
 8840  8841 -8842 -690  8844 0
 8840  8841 -8842 -690 -8845 0

c  2+1 --> break 
c    (-b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧  p_690) -> break
c  in CNF:
c     b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 8840 -8841  8842 -690 1162 0


c  2-1 --> 1
c    (-b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧ -p_690) -> (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0)
c  in CNF:
c     b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_2
c     b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_1
c     b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨  b^{5, 139}_0
c  in DIMACS:
 8840 -8841  8842  690 -8843 0
 8840 -8841  8842  690 -8844 0
 8840 -8841  8842  690  8845 0

c  1-1 --> 0
c    (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0 ∧ -p_690) -> (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧ -b^{5, 139}_0)
c  in CNF:
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_2
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_1
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_0
c  in DIMACS:
 8840  8841 -8842  690 -8843 0
 8840  8841 -8842  690 -8844 0
 8840  8841 -8842  690 -8845 0

c  0-1 --> -1
c    (-b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧ -p_690) -> ( b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0)
c  in CNF:
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨  b^{5, 139}_2
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_1
c     b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨  b^{5, 139}_0
c  in DIMACS:
 8840  8841  8842  690  8843 0
 8840  8841  8842  690 -8844 0
 8840  8841  8842  690  8845 0

c  -1-1 --> -2
c    ( b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧  b^{5, 138}_0 ∧ -p_690) -> ( b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0)
c  in CNF:
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨  b^{5, 139}_2
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨  b^{5, 139}_1
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨  p_690 ∨ -b^{5, 139}_0
c  in DIMACS:
-8840  8841 -8842  690  8843 0
-8840  8841 -8842  690  8844 0
-8840  8841 -8842  690 -8845 0

c  -2-1 --> break 
c    ( b^{5, 138}_2 ∧  b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨  b^{5, 138}_0 ∨  p_690 ∨ break
c  in DIMACS:
-8840 -8841  8842  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 138}_2 ∧ -b^{5, 138}_1 ∧ -b^{5, 138}_0 ∧ true) 
c  in CNF:
c    -b^{5, 138}_2 ∨  b^{5, 138}_1 ∨  b^{5, 138}_0 ∨ false 
c  in DIMACS:
-8840  8841  8842  0

c  3 does not represent an automaton state.
c    -(-b^{5, 138}_2 ∧  b^{5, 138}_1 ∧  b^{5, 138}_0 ∧ true) 
c  in CNF:
c     b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ false 
c  in DIMACS:
 8840 -8841 -8842  0
c  -3 does not represent an automaton state.
c    -( b^{5, 138}_2 ∧  b^{5, 138}_1 ∧  b^{5, 138}_0 ∧ true) 
c  in CNF:
c    -b^{5, 138}_2 ∨ -b^{5, 138}_1 ∨ -b^{5, 138}_0 ∨ false 
c  in DIMACS:
-8840 -8841 -8842  0

c i = 139
c  -2+1 --> -1
c    ( b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧  p_695) -> ( b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0)
c  in CNF:
c    -b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨  b^{5, 140}_2
c    -b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_1
c    -b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨  b^{5, 140}_0
c  in DIMACS:
-8843 -8844  8845 -695  8846 0
-8843 -8844  8845 -695 -8847 0
-8843 -8844  8845 -695  8848 0

c  -1+1 --> 0
c    ( b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0 ∧  p_695) -> (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧ -b^{5, 140}_0)
c  in CNF:
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_2
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_1
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_0
c  in DIMACS:
-8843  8844 -8845 -695 -8846 0
-8843  8844 -8845 -695 -8847 0
-8843  8844 -8845 -695 -8848 0

c  0+1 --> 1
c    (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧  p_695) -> (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0)
c  in CNF:
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_2
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_1
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨  b^{5, 140}_0
c  in DIMACS:
 8843  8844  8845 -695 -8846 0
 8843  8844  8845 -695 -8847 0
 8843  8844  8845 -695  8848 0

c  1+1 --> 2
c    (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0 ∧  p_695) -> (-b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0)
c  in CNF:
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_2
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨  b^{5, 140}_1
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ -p_695 ∨ -b^{5, 140}_0
c  in DIMACS:
 8843  8844 -8845 -695 -8846 0
 8843  8844 -8845 -695  8847 0
 8843  8844 -8845 -695 -8848 0

c  2+1 --> break 
c    (-b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧  p_695) -> break
c  in CNF:
c     b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ -p_695 ∨ break
c  in DIMACS:
 8843 -8844  8845 -695 1162 0


c  2-1 --> 1
c    (-b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧ -p_695) -> (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0)
c  in CNF:
c     b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_2
c     b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_1
c     b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨  b^{5, 140}_0
c  in DIMACS:
 8843 -8844  8845  695 -8846 0
 8843 -8844  8845  695 -8847 0
 8843 -8844  8845  695  8848 0

c  1-1 --> 0
c    (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0 ∧ -p_695) -> (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧ -b^{5, 140}_0)
c  in CNF:
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_2
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_1
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_0
c  in DIMACS:
 8843  8844 -8845  695 -8846 0
 8843  8844 -8845  695 -8847 0
 8843  8844 -8845  695 -8848 0

c  0-1 --> -1
c    (-b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧ -p_695) -> ( b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0)
c  in CNF:
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨  b^{5, 140}_2
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_1
c     b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨  b^{5, 140}_0
c  in DIMACS:
 8843  8844  8845  695  8846 0
 8843  8844  8845  695 -8847 0
 8843  8844  8845  695  8848 0

c  -1-1 --> -2
c    ( b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧  b^{5, 139}_0 ∧ -p_695) -> ( b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0)
c  in CNF:
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨  b^{5, 140}_2
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨  b^{5, 140}_1
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨  p_695 ∨ -b^{5, 140}_0
c  in DIMACS:
-8843  8844 -8845  695  8846 0
-8843  8844 -8845  695  8847 0
-8843  8844 -8845  695 -8848 0

c  -2-1 --> break 
c    ( b^{5, 139}_2 ∧  b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧ -p_695) -> break
c  in CNF:
c    -b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨  b^{5, 139}_0 ∨  p_695 ∨ break
c  in DIMACS:
-8843 -8844  8845  695 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 139}_2 ∧ -b^{5, 139}_1 ∧ -b^{5, 139}_0 ∧ true) 
c  in CNF:
c    -b^{5, 139}_2 ∨  b^{5, 139}_1 ∨  b^{5, 139}_0 ∨ false 
c  in DIMACS:
-8843  8844  8845  0

c  3 does not represent an automaton state.
c    -(-b^{5, 139}_2 ∧  b^{5, 139}_1 ∧  b^{5, 139}_0 ∧ true) 
c  in CNF:
c     b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ false 
c  in DIMACS:
 8843 -8844 -8845  0
c  -3 does not represent an automaton state.
c    -( b^{5, 139}_2 ∧  b^{5, 139}_1 ∧  b^{5, 139}_0 ∧ true) 
c  in CNF:
c    -b^{5, 139}_2 ∨ -b^{5, 139}_1 ∨ -b^{5, 139}_0 ∨ false 
c  in DIMACS:
-8843 -8844 -8845  0

c i = 140
c  -2+1 --> -1
c    ( b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧  p_700) -> ( b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0)
c  in CNF:
c    -b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨  b^{5, 141}_2
c    -b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_1
c    -b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨  b^{5, 141}_0
c  in DIMACS:
-8846 -8847  8848 -700  8849 0
-8846 -8847  8848 -700 -8850 0
-8846 -8847  8848 -700  8851 0

c  -1+1 --> 0
c    ( b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0 ∧  p_700) -> (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧ -b^{5, 141}_0)
c  in CNF:
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_2
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_1
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_0
c  in DIMACS:
-8846  8847 -8848 -700 -8849 0
-8846  8847 -8848 -700 -8850 0
-8846  8847 -8848 -700 -8851 0

c  0+1 --> 1
c    (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧  p_700) -> (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0)
c  in CNF:
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_2
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_1
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨  b^{5, 141}_0
c  in DIMACS:
 8846  8847  8848 -700 -8849 0
 8846  8847  8848 -700 -8850 0
 8846  8847  8848 -700  8851 0

c  1+1 --> 2
c    (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0 ∧  p_700) -> (-b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0)
c  in CNF:
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_2
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨  b^{5, 141}_1
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ -p_700 ∨ -b^{5, 141}_0
c  in DIMACS:
 8846  8847 -8848 -700 -8849 0
 8846  8847 -8848 -700  8850 0
 8846  8847 -8848 -700 -8851 0

c  2+1 --> break 
c    (-b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧  p_700) -> break
c  in CNF:
c     b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 8846 -8847  8848 -700 1162 0


c  2-1 --> 1
c    (-b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧ -p_700) -> (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0)
c  in CNF:
c     b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_2
c     b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_1
c     b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨  b^{5, 141}_0
c  in DIMACS:
 8846 -8847  8848  700 -8849 0
 8846 -8847  8848  700 -8850 0
 8846 -8847  8848  700  8851 0

c  1-1 --> 0
c    (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0 ∧ -p_700) -> (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧ -b^{5, 141}_0)
c  in CNF:
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_2
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_1
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_0
c  in DIMACS:
 8846  8847 -8848  700 -8849 0
 8846  8847 -8848  700 -8850 0
 8846  8847 -8848  700 -8851 0

c  0-1 --> -1
c    (-b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧ -p_700) -> ( b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0)
c  in CNF:
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨  b^{5, 141}_2
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_1
c     b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨  b^{5, 141}_0
c  in DIMACS:
 8846  8847  8848  700  8849 0
 8846  8847  8848  700 -8850 0
 8846  8847  8848  700  8851 0

c  -1-1 --> -2
c    ( b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧  b^{5, 140}_0 ∧ -p_700) -> ( b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0)
c  in CNF:
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨  b^{5, 141}_2
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨  b^{5, 141}_1
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨  p_700 ∨ -b^{5, 141}_0
c  in DIMACS:
-8846  8847 -8848  700  8849 0
-8846  8847 -8848  700  8850 0
-8846  8847 -8848  700 -8851 0

c  -2-1 --> break 
c    ( b^{5, 140}_2 ∧  b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨  b^{5, 140}_0 ∨  p_700 ∨ break
c  in DIMACS:
-8846 -8847  8848  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 140}_2 ∧ -b^{5, 140}_1 ∧ -b^{5, 140}_0 ∧ true) 
c  in CNF:
c    -b^{5, 140}_2 ∨  b^{5, 140}_1 ∨  b^{5, 140}_0 ∨ false 
c  in DIMACS:
-8846  8847  8848  0

c  3 does not represent an automaton state.
c    -(-b^{5, 140}_2 ∧  b^{5, 140}_1 ∧  b^{5, 140}_0 ∧ true) 
c  in CNF:
c     b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ false 
c  in DIMACS:
 8846 -8847 -8848  0
c  -3 does not represent an automaton state.
c    -( b^{5, 140}_2 ∧  b^{5, 140}_1 ∧  b^{5, 140}_0 ∧ true) 
c  in CNF:
c    -b^{5, 140}_2 ∨ -b^{5, 140}_1 ∨ -b^{5, 140}_0 ∨ false 
c  in DIMACS:
-8846 -8847 -8848  0

c i = 141
c  -2+1 --> -1
c    ( b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧  p_705) -> ( b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0)
c  in CNF:
c    -b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨  b^{5, 142}_2
c    -b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_1
c    -b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨  b^{5, 142}_0
c  in DIMACS:
-8849 -8850  8851 -705  8852 0
-8849 -8850  8851 -705 -8853 0
-8849 -8850  8851 -705  8854 0

c  -1+1 --> 0
c    ( b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0 ∧  p_705) -> (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧ -b^{5, 142}_0)
c  in CNF:
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_2
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_1
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_0
c  in DIMACS:
-8849  8850 -8851 -705 -8852 0
-8849  8850 -8851 -705 -8853 0
-8849  8850 -8851 -705 -8854 0

c  0+1 --> 1
c    (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧  p_705) -> (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0)
c  in CNF:
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_2
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_1
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨  b^{5, 142}_0
c  in DIMACS:
 8849  8850  8851 -705 -8852 0
 8849  8850  8851 -705 -8853 0
 8849  8850  8851 -705  8854 0

c  1+1 --> 2
c    (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0 ∧  p_705) -> (-b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0)
c  in CNF:
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_2
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨  b^{5, 142}_1
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ -p_705 ∨ -b^{5, 142}_0
c  in DIMACS:
 8849  8850 -8851 -705 -8852 0
 8849  8850 -8851 -705  8853 0
 8849  8850 -8851 -705 -8854 0

c  2+1 --> break 
c    (-b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧  p_705) -> break
c  in CNF:
c     b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 8849 -8850  8851 -705 1162 0


c  2-1 --> 1
c    (-b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧ -p_705) -> (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0)
c  in CNF:
c     b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_2
c     b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_1
c     b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨  b^{5, 142}_0
c  in DIMACS:
 8849 -8850  8851  705 -8852 0
 8849 -8850  8851  705 -8853 0
 8849 -8850  8851  705  8854 0

c  1-1 --> 0
c    (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0 ∧ -p_705) -> (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧ -b^{5, 142}_0)
c  in CNF:
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_2
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_1
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_0
c  in DIMACS:
 8849  8850 -8851  705 -8852 0
 8849  8850 -8851  705 -8853 0
 8849  8850 -8851  705 -8854 0

c  0-1 --> -1
c    (-b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧ -p_705) -> ( b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0)
c  in CNF:
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨  b^{5, 142}_2
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_1
c     b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨  b^{5, 142}_0
c  in DIMACS:
 8849  8850  8851  705  8852 0
 8849  8850  8851  705 -8853 0
 8849  8850  8851  705  8854 0

c  -1-1 --> -2
c    ( b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧  b^{5, 141}_0 ∧ -p_705) -> ( b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0)
c  in CNF:
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨  b^{5, 142}_2
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨  b^{5, 142}_1
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨  p_705 ∨ -b^{5, 142}_0
c  in DIMACS:
-8849  8850 -8851  705  8852 0
-8849  8850 -8851  705  8853 0
-8849  8850 -8851  705 -8854 0

c  -2-1 --> break 
c    ( b^{5, 141}_2 ∧  b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨  b^{5, 141}_0 ∨  p_705 ∨ break
c  in DIMACS:
-8849 -8850  8851  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 141}_2 ∧ -b^{5, 141}_1 ∧ -b^{5, 141}_0 ∧ true) 
c  in CNF:
c    -b^{5, 141}_2 ∨  b^{5, 141}_1 ∨  b^{5, 141}_0 ∨ false 
c  in DIMACS:
-8849  8850  8851  0

c  3 does not represent an automaton state.
c    -(-b^{5, 141}_2 ∧  b^{5, 141}_1 ∧  b^{5, 141}_0 ∧ true) 
c  in CNF:
c     b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ false 
c  in DIMACS:
 8849 -8850 -8851  0
c  -3 does not represent an automaton state.
c    -( b^{5, 141}_2 ∧  b^{5, 141}_1 ∧  b^{5, 141}_0 ∧ true) 
c  in CNF:
c    -b^{5, 141}_2 ∨ -b^{5, 141}_1 ∨ -b^{5, 141}_0 ∨ false 
c  in DIMACS:
-8849 -8850 -8851  0

c i = 142
c  -2+1 --> -1
c    ( b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧  p_710) -> ( b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0)
c  in CNF:
c    -b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨  b^{5, 143}_2
c    -b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_1
c    -b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨  b^{5, 143}_0
c  in DIMACS:
-8852 -8853  8854 -710  8855 0
-8852 -8853  8854 -710 -8856 0
-8852 -8853  8854 -710  8857 0

c  -1+1 --> 0
c    ( b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0 ∧  p_710) -> (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧ -b^{5, 143}_0)
c  in CNF:
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_2
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_1
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_0
c  in DIMACS:
-8852  8853 -8854 -710 -8855 0
-8852  8853 -8854 -710 -8856 0
-8852  8853 -8854 -710 -8857 0

c  0+1 --> 1
c    (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧  p_710) -> (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0)
c  in CNF:
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_2
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_1
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨  b^{5, 143}_0
c  in DIMACS:
 8852  8853  8854 -710 -8855 0
 8852  8853  8854 -710 -8856 0
 8852  8853  8854 -710  8857 0

c  1+1 --> 2
c    (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0 ∧  p_710) -> (-b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0)
c  in CNF:
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_2
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨  b^{5, 143}_1
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ -p_710 ∨ -b^{5, 143}_0
c  in DIMACS:
 8852  8853 -8854 -710 -8855 0
 8852  8853 -8854 -710  8856 0
 8852  8853 -8854 -710 -8857 0

c  2+1 --> break 
c    (-b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧  p_710) -> break
c  in CNF:
c     b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 8852 -8853  8854 -710 1162 0


c  2-1 --> 1
c    (-b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧ -p_710) -> (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0)
c  in CNF:
c     b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_2
c     b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_1
c     b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨  b^{5, 143}_0
c  in DIMACS:
 8852 -8853  8854  710 -8855 0
 8852 -8853  8854  710 -8856 0
 8852 -8853  8854  710  8857 0

c  1-1 --> 0
c    (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0 ∧ -p_710) -> (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧ -b^{5, 143}_0)
c  in CNF:
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_2
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_1
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_0
c  in DIMACS:
 8852  8853 -8854  710 -8855 0
 8852  8853 -8854  710 -8856 0
 8852  8853 -8854  710 -8857 0

c  0-1 --> -1
c    (-b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧ -p_710) -> ( b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0)
c  in CNF:
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨  b^{5, 143}_2
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_1
c     b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨  b^{5, 143}_0
c  in DIMACS:
 8852  8853  8854  710  8855 0
 8852  8853  8854  710 -8856 0
 8852  8853  8854  710  8857 0

c  -1-1 --> -2
c    ( b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧  b^{5, 142}_0 ∧ -p_710) -> ( b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0)
c  in CNF:
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨  b^{5, 143}_2
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨  b^{5, 143}_1
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨  p_710 ∨ -b^{5, 143}_0
c  in DIMACS:
-8852  8853 -8854  710  8855 0
-8852  8853 -8854  710  8856 0
-8852  8853 -8854  710 -8857 0

c  -2-1 --> break 
c    ( b^{5, 142}_2 ∧  b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨  b^{5, 142}_0 ∨  p_710 ∨ break
c  in DIMACS:
-8852 -8853  8854  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 142}_2 ∧ -b^{5, 142}_1 ∧ -b^{5, 142}_0 ∧ true) 
c  in CNF:
c    -b^{5, 142}_2 ∨  b^{5, 142}_1 ∨  b^{5, 142}_0 ∨ false 
c  in DIMACS:
-8852  8853  8854  0

c  3 does not represent an automaton state.
c    -(-b^{5, 142}_2 ∧  b^{5, 142}_1 ∧  b^{5, 142}_0 ∧ true) 
c  in CNF:
c     b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ false 
c  in DIMACS:
 8852 -8853 -8854  0
c  -3 does not represent an automaton state.
c    -( b^{5, 142}_2 ∧  b^{5, 142}_1 ∧  b^{5, 142}_0 ∧ true) 
c  in CNF:
c    -b^{5, 142}_2 ∨ -b^{5, 142}_1 ∨ -b^{5, 142}_0 ∨ false 
c  in DIMACS:
-8852 -8853 -8854  0

c i = 143
c  -2+1 --> -1
c    ( b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧  p_715) -> ( b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0)
c  in CNF:
c    -b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨  b^{5, 144}_2
c    -b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_1
c    -b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨  b^{5, 144}_0
c  in DIMACS:
-8855 -8856  8857 -715  8858 0
-8855 -8856  8857 -715 -8859 0
-8855 -8856  8857 -715  8860 0

c  -1+1 --> 0
c    ( b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0 ∧  p_715) -> (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧ -b^{5, 144}_0)
c  in CNF:
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_2
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_1
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_0
c  in DIMACS:
-8855  8856 -8857 -715 -8858 0
-8855  8856 -8857 -715 -8859 0
-8855  8856 -8857 -715 -8860 0

c  0+1 --> 1
c    (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧  p_715) -> (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0)
c  in CNF:
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_2
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_1
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨  b^{5, 144}_0
c  in DIMACS:
 8855  8856  8857 -715 -8858 0
 8855  8856  8857 -715 -8859 0
 8855  8856  8857 -715  8860 0

c  1+1 --> 2
c    (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0 ∧  p_715) -> (-b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0)
c  in CNF:
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_2
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨  b^{5, 144}_1
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ -p_715 ∨ -b^{5, 144}_0
c  in DIMACS:
 8855  8856 -8857 -715 -8858 0
 8855  8856 -8857 -715  8859 0
 8855  8856 -8857 -715 -8860 0

c  2+1 --> break 
c    (-b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧  p_715) -> break
c  in CNF:
c     b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 8855 -8856  8857 -715 1162 0


c  2-1 --> 1
c    (-b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧ -p_715) -> (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0)
c  in CNF:
c     b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_2
c     b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_1
c     b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨  b^{5, 144}_0
c  in DIMACS:
 8855 -8856  8857  715 -8858 0
 8855 -8856  8857  715 -8859 0
 8855 -8856  8857  715  8860 0

c  1-1 --> 0
c    (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0 ∧ -p_715) -> (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧ -b^{5, 144}_0)
c  in CNF:
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_2
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_1
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_0
c  in DIMACS:
 8855  8856 -8857  715 -8858 0
 8855  8856 -8857  715 -8859 0
 8855  8856 -8857  715 -8860 0

c  0-1 --> -1
c    (-b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧ -p_715) -> ( b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0)
c  in CNF:
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨  b^{5, 144}_2
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_1
c     b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨  b^{5, 144}_0
c  in DIMACS:
 8855  8856  8857  715  8858 0
 8855  8856  8857  715 -8859 0
 8855  8856  8857  715  8860 0

c  -1-1 --> -2
c    ( b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧  b^{5, 143}_0 ∧ -p_715) -> ( b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0)
c  in CNF:
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨  b^{5, 144}_2
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨  b^{5, 144}_1
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨  p_715 ∨ -b^{5, 144}_0
c  in DIMACS:
-8855  8856 -8857  715  8858 0
-8855  8856 -8857  715  8859 0
-8855  8856 -8857  715 -8860 0

c  -2-1 --> break 
c    ( b^{5, 143}_2 ∧  b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨  b^{5, 143}_0 ∨  p_715 ∨ break
c  in DIMACS:
-8855 -8856  8857  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 143}_2 ∧ -b^{5, 143}_1 ∧ -b^{5, 143}_0 ∧ true) 
c  in CNF:
c    -b^{5, 143}_2 ∨  b^{5, 143}_1 ∨  b^{5, 143}_0 ∨ false 
c  in DIMACS:
-8855  8856  8857  0

c  3 does not represent an automaton state.
c    -(-b^{5, 143}_2 ∧  b^{5, 143}_1 ∧  b^{5, 143}_0 ∧ true) 
c  in CNF:
c     b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ false 
c  in DIMACS:
 8855 -8856 -8857  0
c  -3 does not represent an automaton state.
c    -( b^{5, 143}_2 ∧  b^{5, 143}_1 ∧  b^{5, 143}_0 ∧ true) 
c  in CNF:
c    -b^{5, 143}_2 ∨ -b^{5, 143}_1 ∨ -b^{5, 143}_0 ∨ false 
c  in DIMACS:
-8855 -8856 -8857  0

c i = 144
c  -2+1 --> -1
c    ( b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧  p_720) -> ( b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0)
c  in CNF:
c    -b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨  b^{5, 145}_2
c    -b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_1
c    -b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨  b^{5, 145}_0
c  in DIMACS:
-8858 -8859  8860 -720  8861 0
-8858 -8859  8860 -720 -8862 0
-8858 -8859  8860 -720  8863 0

c  -1+1 --> 0
c    ( b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0 ∧  p_720) -> (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧ -b^{5, 145}_0)
c  in CNF:
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_2
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_1
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_0
c  in DIMACS:
-8858  8859 -8860 -720 -8861 0
-8858  8859 -8860 -720 -8862 0
-8858  8859 -8860 -720 -8863 0

c  0+1 --> 1
c    (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧  p_720) -> (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0)
c  in CNF:
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_2
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_1
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨  b^{5, 145}_0
c  in DIMACS:
 8858  8859  8860 -720 -8861 0
 8858  8859  8860 -720 -8862 0
 8858  8859  8860 -720  8863 0

c  1+1 --> 2
c    (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0 ∧  p_720) -> (-b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0)
c  in CNF:
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_2
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨  b^{5, 145}_1
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ -p_720 ∨ -b^{5, 145}_0
c  in DIMACS:
 8858  8859 -8860 -720 -8861 0
 8858  8859 -8860 -720  8862 0
 8858  8859 -8860 -720 -8863 0

c  2+1 --> break 
c    (-b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧  p_720) -> break
c  in CNF:
c     b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 8858 -8859  8860 -720 1162 0


c  2-1 --> 1
c    (-b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧ -p_720) -> (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0)
c  in CNF:
c     b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_2
c     b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_1
c     b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨  b^{5, 145}_0
c  in DIMACS:
 8858 -8859  8860  720 -8861 0
 8858 -8859  8860  720 -8862 0
 8858 -8859  8860  720  8863 0

c  1-1 --> 0
c    (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0 ∧ -p_720) -> (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧ -b^{5, 145}_0)
c  in CNF:
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_2
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_1
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_0
c  in DIMACS:
 8858  8859 -8860  720 -8861 0
 8858  8859 -8860  720 -8862 0
 8858  8859 -8860  720 -8863 0

c  0-1 --> -1
c    (-b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧ -p_720) -> ( b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0)
c  in CNF:
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨  b^{5, 145}_2
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_1
c     b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨  b^{5, 145}_0
c  in DIMACS:
 8858  8859  8860  720  8861 0
 8858  8859  8860  720 -8862 0
 8858  8859  8860  720  8863 0

c  -1-1 --> -2
c    ( b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧  b^{5, 144}_0 ∧ -p_720) -> ( b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0)
c  in CNF:
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨  b^{5, 145}_2
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨  b^{5, 145}_1
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨  p_720 ∨ -b^{5, 145}_0
c  in DIMACS:
-8858  8859 -8860  720  8861 0
-8858  8859 -8860  720  8862 0
-8858  8859 -8860  720 -8863 0

c  -2-1 --> break 
c    ( b^{5, 144}_2 ∧  b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨  b^{5, 144}_0 ∨  p_720 ∨ break
c  in DIMACS:
-8858 -8859  8860  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 144}_2 ∧ -b^{5, 144}_1 ∧ -b^{5, 144}_0 ∧ true) 
c  in CNF:
c    -b^{5, 144}_2 ∨  b^{5, 144}_1 ∨  b^{5, 144}_0 ∨ false 
c  in DIMACS:
-8858  8859  8860  0

c  3 does not represent an automaton state.
c    -(-b^{5, 144}_2 ∧  b^{5, 144}_1 ∧  b^{5, 144}_0 ∧ true) 
c  in CNF:
c     b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ false 
c  in DIMACS:
 8858 -8859 -8860  0
c  -3 does not represent an automaton state.
c    -( b^{5, 144}_2 ∧  b^{5, 144}_1 ∧  b^{5, 144}_0 ∧ true) 
c  in CNF:
c    -b^{5, 144}_2 ∨ -b^{5, 144}_1 ∨ -b^{5, 144}_0 ∨ false 
c  in DIMACS:
-8858 -8859 -8860  0

c i = 145
c  -2+1 --> -1
c    ( b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧  p_725) -> ( b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0)
c  in CNF:
c    -b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨  b^{5, 146}_2
c    -b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_1
c    -b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨  b^{5, 146}_0
c  in DIMACS:
-8861 -8862  8863 -725  8864 0
-8861 -8862  8863 -725 -8865 0
-8861 -8862  8863 -725  8866 0

c  -1+1 --> 0
c    ( b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0 ∧  p_725) -> (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧ -b^{5, 146}_0)
c  in CNF:
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_2
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_1
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_0
c  in DIMACS:
-8861  8862 -8863 -725 -8864 0
-8861  8862 -8863 -725 -8865 0
-8861  8862 -8863 -725 -8866 0

c  0+1 --> 1
c    (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧  p_725) -> (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0)
c  in CNF:
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_2
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_1
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨  b^{5, 146}_0
c  in DIMACS:
 8861  8862  8863 -725 -8864 0
 8861  8862  8863 -725 -8865 0
 8861  8862  8863 -725  8866 0

c  1+1 --> 2
c    (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0 ∧  p_725) -> (-b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0)
c  in CNF:
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_2
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨  b^{5, 146}_1
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ -p_725 ∨ -b^{5, 146}_0
c  in DIMACS:
 8861  8862 -8863 -725 -8864 0
 8861  8862 -8863 -725  8865 0
 8861  8862 -8863 -725 -8866 0

c  2+1 --> break 
c    (-b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧  p_725) -> break
c  in CNF:
c     b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ -p_725 ∨ break
c  in DIMACS:
 8861 -8862  8863 -725 1162 0


c  2-1 --> 1
c    (-b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧ -p_725) -> (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0)
c  in CNF:
c     b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_2
c     b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_1
c     b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨  b^{5, 146}_0
c  in DIMACS:
 8861 -8862  8863  725 -8864 0
 8861 -8862  8863  725 -8865 0
 8861 -8862  8863  725  8866 0

c  1-1 --> 0
c    (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0 ∧ -p_725) -> (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧ -b^{5, 146}_0)
c  in CNF:
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_2
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_1
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_0
c  in DIMACS:
 8861  8862 -8863  725 -8864 0
 8861  8862 -8863  725 -8865 0
 8861  8862 -8863  725 -8866 0

c  0-1 --> -1
c    (-b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧ -p_725) -> ( b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0)
c  in CNF:
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨  b^{5, 146}_2
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_1
c     b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨  b^{5, 146}_0
c  in DIMACS:
 8861  8862  8863  725  8864 0
 8861  8862  8863  725 -8865 0
 8861  8862  8863  725  8866 0

c  -1-1 --> -2
c    ( b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧  b^{5, 145}_0 ∧ -p_725) -> ( b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0)
c  in CNF:
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨  b^{5, 146}_2
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨  b^{5, 146}_1
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨  p_725 ∨ -b^{5, 146}_0
c  in DIMACS:
-8861  8862 -8863  725  8864 0
-8861  8862 -8863  725  8865 0
-8861  8862 -8863  725 -8866 0

c  -2-1 --> break 
c    ( b^{5, 145}_2 ∧  b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧ -p_725) -> break
c  in CNF:
c    -b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨  b^{5, 145}_0 ∨  p_725 ∨ break
c  in DIMACS:
-8861 -8862  8863  725 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 145}_2 ∧ -b^{5, 145}_1 ∧ -b^{5, 145}_0 ∧ true) 
c  in CNF:
c    -b^{5, 145}_2 ∨  b^{5, 145}_1 ∨  b^{5, 145}_0 ∨ false 
c  in DIMACS:
-8861  8862  8863  0

c  3 does not represent an automaton state.
c    -(-b^{5, 145}_2 ∧  b^{5, 145}_1 ∧  b^{5, 145}_0 ∧ true) 
c  in CNF:
c     b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ false 
c  in DIMACS:
 8861 -8862 -8863  0
c  -3 does not represent an automaton state.
c    -( b^{5, 145}_2 ∧  b^{5, 145}_1 ∧  b^{5, 145}_0 ∧ true) 
c  in CNF:
c    -b^{5, 145}_2 ∨ -b^{5, 145}_1 ∨ -b^{5, 145}_0 ∨ false 
c  in DIMACS:
-8861 -8862 -8863  0

c i = 146
c  -2+1 --> -1
c    ( b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧  p_730) -> ( b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0)
c  in CNF:
c    -b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨  b^{5, 147}_2
c    -b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_1
c    -b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨  b^{5, 147}_0
c  in DIMACS:
-8864 -8865  8866 -730  8867 0
-8864 -8865  8866 -730 -8868 0
-8864 -8865  8866 -730  8869 0

c  -1+1 --> 0
c    ( b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0 ∧  p_730) -> (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧ -b^{5, 147}_0)
c  in CNF:
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_2
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_1
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_0
c  in DIMACS:
-8864  8865 -8866 -730 -8867 0
-8864  8865 -8866 -730 -8868 0
-8864  8865 -8866 -730 -8869 0

c  0+1 --> 1
c    (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧  p_730) -> (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0)
c  in CNF:
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_2
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_1
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨  b^{5, 147}_0
c  in DIMACS:
 8864  8865  8866 -730 -8867 0
 8864  8865  8866 -730 -8868 0
 8864  8865  8866 -730  8869 0

c  1+1 --> 2
c    (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0 ∧  p_730) -> (-b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0)
c  in CNF:
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_2
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨  b^{5, 147}_1
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ -p_730 ∨ -b^{5, 147}_0
c  in DIMACS:
 8864  8865 -8866 -730 -8867 0
 8864  8865 -8866 -730  8868 0
 8864  8865 -8866 -730 -8869 0

c  2+1 --> break 
c    (-b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧  p_730) -> break
c  in CNF:
c     b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 8864 -8865  8866 -730 1162 0


c  2-1 --> 1
c    (-b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧ -p_730) -> (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0)
c  in CNF:
c     b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_2
c     b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_1
c     b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨  b^{5, 147}_0
c  in DIMACS:
 8864 -8865  8866  730 -8867 0
 8864 -8865  8866  730 -8868 0
 8864 -8865  8866  730  8869 0

c  1-1 --> 0
c    (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0 ∧ -p_730) -> (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧ -b^{5, 147}_0)
c  in CNF:
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_2
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_1
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_0
c  in DIMACS:
 8864  8865 -8866  730 -8867 0
 8864  8865 -8866  730 -8868 0
 8864  8865 -8866  730 -8869 0

c  0-1 --> -1
c    (-b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧ -p_730) -> ( b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0)
c  in CNF:
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨  b^{5, 147}_2
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_1
c     b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨  b^{5, 147}_0
c  in DIMACS:
 8864  8865  8866  730  8867 0
 8864  8865  8866  730 -8868 0
 8864  8865  8866  730  8869 0

c  -1-1 --> -2
c    ( b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧  b^{5, 146}_0 ∧ -p_730) -> ( b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0)
c  in CNF:
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨  b^{5, 147}_2
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨  b^{5, 147}_1
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨  p_730 ∨ -b^{5, 147}_0
c  in DIMACS:
-8864  8865 -8866  730  8867 0
-8864  8865 -8866  730  8868 0
-8864  8865 -8866  730 -8869 0

c  -2-1 --> break 
c    ( b^{5, 146}_2 ∧  b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨  b^{5, 146}_0 ∨  p_730 ∨ break
c  in DIMACS:
-8864 -8865  8866  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 146}_2 ∧ -b^{5, 146}_1 ∧ -b^{5, 146}_0 ∧ true) 
c  in CNF:
c    -b^{5, 146}_2 ∨  b^{5, 146}_1 ∨  b^{5, 146}_0 ∨ false 
c  in DIMACS:
-8864  8865  8866  0

c  3 does not represent an automaton state.
c    -(-b^{5, 146}_2 ∧  b^{5, 146}_1 ∧  b^{5, 146}_0 ∧ true) 
c  in CNF:
c     b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ false 
c  in DIMACS:
 8864 -8865 -8866  0
c  -3 does not represent an automaton state.
c    -( b^{5, 146}_2 ∧  b^{5, 146}_1 ∧  b^{5, 146}_0 ∧ true) 
c  in CNF:
c    -b^{5, 146}_2 ∨ -b^{5, 146}_1 ∨ -b^{5, 146}_0 ∨ false 
c  in DIMACS:
-8864 -8865 -8866  0

c i = 147
c  -2+1 --> -1
c    ( b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧  p_735) -> ( b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0)
c  in CNF:
c    -b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨  b^{5, 148}_2
c    -b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_1
c    -b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨  b^{5, 148}_0
c  in DIMACS:
-8867 -8868  8869 -735  8870 0
-8867 -8868  8869 -735 -8871 0
-8867 -8868  8869 -735  8872 0

c  -1+1 --> 0
c    ( b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0 ∧  p_735) -> (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧ -b^{5, 148}_0)
c  in CNF:
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_2
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_1
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_0
c  in DIMACS:
-8867  8868 -8869 -735 -8870 0
-8867  8868 -8869 -735 -8871 0
-8867  8868 -8869 -735 -8872 0

c  0+1 --> 1
c    (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧  p_735) -> (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0)
c  in CNF:
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_2
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_1
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨  b^{5, 148}_0
c  in DIMACS:
 8867  8868  8869 -735 -8870 0
 8867  8868  8869 -735 -8871 0
 8867  8868  8869 -735  8872 0

c  1+1 --> 2
c    (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0 ∧  p_735) -> (-b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0)
c  in CNF:
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_2
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨  b^{5, 148}_1
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ -p_735 ∨ -b^{5, 148}_0
c  in DIMACS:
 8867  8868 -8869 -735 -8870 0
 8867  8868 -8869 -735  8871 0
 8867  8868 -8869 -735 -8872 0

c  2+1 --> break 
c    (-b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧  p_735) -> break
c  in CNF:
c     b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 8867 -8868  8869 -735 1162 0


c  2-1 --> 1
c    (-b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧ -p_735) -> (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0)
c  in CNF:
c     b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_2
c     b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_1
c     b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨  b^{5, 148}_0
c  in DIMACS:
 8867 -8868  8869  735 -8870 0
 8867 -8868  8869  735 -8871 0
 8867 -8868  8869  735  8872 0

c  1-1 --> 0
c    (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0 ∧ -p_735) -> (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧ -b^{5, 148}_0)
c  in CNF:
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_2
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_1
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_0
c  in DIMACS:
 8867  8868 -8869  735 -8870 0
 8867  8868 -8869  735 -8871 0
 8867  8868 -8869  735 -8872 0

c  0-1 --> -1
c    (-b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧ -p_735) -> ( b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0)
c  in CNF:
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨  b^{5, 148}_2
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_1
c     b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨  b^{5, 148}_0
c  in DIMACS:
 8867  8868  8869  735  8870 0
 8867  8868  8869  735 -8871 0
 8867  8868  8869  735  8872 0

c  -1-1 --> -2
c    ( b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧  b^{5, 147}_0 ∧ -p_735) -> ( b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0)
c  in CNF:
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨  b^{5, 148}_2
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨  b^{5, 148}_1
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨  p_735 ∨ -b^{5, 148}_0
c  in DIMACS:
-8867  8868 -8869  735  8870 0
-8867  8868 -8869  735  8871 0
-8867  8868 -8869  735 -8872 0

c  -2-1 --> break 
c    ( b^{5, 147}_2 ∧  b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨  b^{5, 147}_0 ∨  p_735 ∨ break
c  in DIMACS:
-8867 -8868  8869  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 147}_2 ∧ -b^{5, 147}_1 ∧ -b^{5, 147}_0 ∧ true) 
c  in CNF:
c    -b^{5, 147}_2 ∨  b^{5, 147}_1 ∨  b^{5, 147}_0 ∨ false 
c  in DIMACS:
-8867  8868  8869  0

c  3 does not represent an automaton state.
c    -(-b^{5, 147}_2 ∧  b^{5, 147}_1 ∧  b^{5, 147}_0 ∧ true) 
c  in CNF:
c     b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ false 
c  in DIMACS:
 8867 -8868 -8869  0
c  -3 does not represent an automaton state.
c    -( b^{5, 147}_2 ∧  b^{5, 147}_1 ∧  b^{5, 147}_0 ∧ true) 
c  in CNF:
c    -b^{5, 147}_2 ∨ -b^{5, 147}_1 ∨ -b^{5, 147}_0 ∨ false 
c  in DIMACS:
-8867 -8868 -8869  0

c i = 148
c  -2+1 --> -1
c    ( b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧  p_740) -> ( b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0)
c  in CNF:
c    -b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨  b^{5, 149}_2
c    -b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_1
c    -b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨  b^{5, 149}_0
c  in DIMACS:
-8870 -8871  8872 -740  8873 0
-8870 -8871  8872 -740 -8874 0
-8870 -8871  8872 -740  8875 0

c  -1+1 --> 0
c    ( b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0 ∧  p_740) -> (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧ -b^{5, 149}_0)
c  in CNF:
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_2
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_1
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_0
c  in DIMACS:
-8870  8871 -8872 -740 -8873 0
-8870  8871 -8872 -740 -8874 0
-8870  8871 -8872 -740 -8875 0

c  0+1 --> 1
c    (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧  p_740) -> (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0)
c  in CNF:
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_2
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_1
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨  b^{5, 149}_0
c  in DIMACS:
 8870  8871  8872 -740 -8873 0
 8870  8871  8872 -740 -8874 0
 8870  8871  8872 -740  8875 0

c  1+1 --> 2
c    (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0 ∧  p_740) -> (-b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0)
c  in CNF:
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_2
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨  b^{5, 149}_1
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ -p_740 ∨ -b^{5, 149}_0
c  in DIMACS:
 8870  8871 -8872 -740 -8873 0
 8870  8871 -8872 -740  8874 0
 8870  8871 -8872 -740 -8875 0

c  2+1 --> break 
c    (-b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧  p_740) -> break
c  in CNF:
c     b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 8870 -8871  8872 -740 1162 0


c  2-1 --> 1
c    (-b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧ -p_740) -> (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0)
c  in CNF:
c     b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_2
c     b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_1
c     b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨  b^{5, 149}_0
c  in DIMACS:
 8870 -8871  8872  740 -8873 0
 8870 -8871  8872  740 -8874 0
 8870 -8871  8872  740  8875 0

c  1-1 --> 0
c    (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0 ∧ -p_740) -> (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧ -b^{5, 149}_0)
c  in CNF:
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_2
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_1
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_0
c  in DIMACS:
 8870  8871 -8872  740 -8873 0
 8870  8871 -8872  740 -8874 0
 8870  8871 -8872  740 -8875 0

c  0-1 --> -1
c    (-b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧ -p_740) -> ( b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0)
c  in CNF:
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨  b^{5, 149}_2
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_1
c     b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨  b^{5, 149}_0
c  in DIMACS:
 8870  8871  8872  740  8873 0
 8870  8871  8872  740 -8874 0
 8870  8871  8872  740  8875 0

c  -1-1 --> -2
c    ( b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧  b^{5, 148}_0 ∧ -p_740) -> ( b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0)
c  in CNF:
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨  b^{5, 149}_2
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨  b^{5, 149}_1
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨  p_740 ∨ -b^{5, 149}_0
c  in DIMACS:
-8870  8871 -8872  740  8873 0
-8870  8871 -8872  740  8874 0
-8870  8871 -8872  740 -8875 0

c  -2-1 --> break 
c    ( b^{5, 148}_2 ∧  b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨  b^{5, 148}_0 ∨  p_740 ∨ break
c  in DIMACS:
-8870 -8871  8872  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 148}_2 ∧ -b^{5, 148}_1 ∧ -b^{5, 148}_0 ∧ true) 
c  in CNF:
c    -b^{5, 148}_2 ∨  b^{5, 148}_1 ∨  b^{5, 148}_0 ∨ false 
c  in DIMACS:
-8870  8871  8872  0

c  3 does not represent an automaton state.
c    -(-b^{5, 148}_2 ∧  b^{5, 148}_1 ∧  b^{5, 148}_0 ∧ true) 
c  in CNF:
c     b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ false 
c  in DIMACS:
 8870 -8871 -8872  0
c  -3 does not represent an automaton state.
c    -( b^{5, 148}_2 ∧  b^{5, 148}_1 ∧  b^{5, 148}_0 ∧ true) 
c  in CNF:
c    -b^{5, 148}_2 ∨ -b^{5, 148}_1 ∨ -b^{5, 148}_0 ∨ false 
c  in DIMACS:
-8870 -8871 -8872  0

c i = 149
c  -2+1 --> -1
c    ( b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧  p_745) -> ( b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0)
c  in CNF:
c    -b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨  b^{5, 150}_2
c    -b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_1
c    -b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨  b^{5, 150}_0
c  in DIMACS:
-8873 -8874  8875 -745  8876 0
-8873 -8874  8875 -745 -8877 0
-8873 -8874  8875 -745  8878 0

c  -1+1 --> 0
c    ( b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0 ∧  p_745) -> (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧ -b^{5, 150}_0)
c  in CNF:
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_2
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_1
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_0
c  in DIMACS:
-8873  8874 -8875 -745 -8876 0
-8873  8874 -8875 -745 -8877 0
-8873  8874 -8875 -745 -8878 0

c  0+1 --> 1
c    (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧  p_745) -> (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0)
c  in CNF:
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_2
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_1
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨  b^{5, 150}_0
c  in DIMACS:
 8873  8874  8875 -745 -8876 0
 8873  8874  8875 -745 -8877 0
 8873  8874  8875 -745  8878 0

c  1+1 --> 2
c    (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0 ∧  p_745) -> (-b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0)
c  in CNF:
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_2
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨  b^{5, 150}_1
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ -p_745 ∨ -b^{5, 150}_0
c  in DIMACS:
 8873  8874 -8875 -745 -8876 0
 8873  8874 -8875 -745  8877 0
 8873  8874 -8875 -745 -8878 0

c  2+1 --> break 
c    (-b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧  p_745) -> break
c  in CNF:
c     b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ -p_745 ∨ break
c  in DIMACS:
 8873 -8874  8875 -745 1162 0


c  2-1 --> 1
c    (-b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧ -p_745) -> (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0)
c  in CNF:
c     b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_2
c     b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_1
c     b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨  b^{5, 150}_0
c  in DIMACS:
 8873 -8874  8875  745 -8876 0
 8873 -8874  8875  745 -8877 0
 8873 -8874  8875  745  8878 0

c  1-1 --> 0
c    (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0 ∧ -p_745) -> (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧ -b^{5, 150}_0)
c  in CNF:
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_2
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_1
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_0
c  in DIMACS:
 8873  8874 -8875  745 -8876 0
 8873  8874 -8875  745 -8877 0
 8873  8874 -8875  745 -8878 0

c  0-1 --> -1
c    (-b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧ -p_745) -> ( b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0)
c  in CNF:
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨  b^{5, 150}_2
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_1
c     b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨  b^{5, 150}_0
c  in DIMACS:
 8873  8874  8875  745  8876 0
 8873  8874  8875  745 -8877 0
 8873  8874  8875  745  8878 0

c  -1-1 --> -2
c    ( b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧  b^{5, 149}_0 ∧ -p_745) -> ( b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0)
c  in CNF:
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨  b^{5, 150}_2
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨  b^{5, 150}_1
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨  p_745 ∨ -b^{5, 150}_0
c  in DIMACS:
-8873  8874 -8875  745  8876 0
-8873  8874 -8875  745  8877 0
-8873  8874 -8875  745 -8878 0

c  -2-1 --> break 
c    ( b^{5, 149}_2 ∧  b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧ -p_745) -> break
c  in CNF:
c    -b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨  b^{5, 149}_0 ∨  p_745 ∨ break
c  in DIMACS:
-8873 -8874  8875  745 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 149}_2 ∧ -b^{5, 149}_1 ∧ -b^{5, 149}_0 ∧ true) 
c  in CNF:
c    -b^{5, 149}_2 ∨  b^{5, 149}_1 ∨  b^{5, 149}_0 ∨ false 
c  in DIMACS:
-8873  8874  8875  0

c  3 does not represent an automaton state.
c    -(-b^{5, 149}_2 ∧  b^{5, 149}_1 ∧  b^{5, 149}_0 ∧ true) 
c  in CNF:
c     b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ false 
c  in DIMACS:
 8873 -8874 -8875  0
c  -3 does not represent an automaton state.
c    -( b^{5, 149}_2 ∧  b^{5, 149}_1 ∧  b^{5, 149}_0 ∧ true) 
c  in CNF:
c    -b^{5, 149}_2 ∨ -b^{5, 149}_1 ∨ -b^{5, 149}_0 ∨ false 
c  in DIMACS:
-8873 -8874 -8875  0

c i = 150
c  -2+1 --> -1
c    ( b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧  p_750) -> ( b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0)
c  in CNF:
c    -b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨  b^{5, 151}_2
c    -b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_1
c    -b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨  b^{5, 151}_0
c  in DIMACS:
-8876 -8877  8878 -750  8879 0
-8876 -8877  8878 -750 -8880 0
-8876 -8877  8878 -750  8881 0

c  -1+1 --> 0
c    ( b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0 ∧  p_750) -> (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧ -b^{5, 151}_0)
c  in CNF:
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_2
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_1
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_0
c  in DIMACS:
-8876  8877 -8878 -750 -8879 0
-8876  8877 -8878 -750 -8880 0
-8876  8877 -8878 -750 -8881 0

c  0+1 --> 1
c    (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧  p_750) -> (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0)
c  in CNF:
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_2
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_1
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨  b^{5, 151}_0
c  in DIMACS:
 8876  8877  8878 -750 -8879 0
 8876  8877  8878 -750 -8880 0
 8876  8877  8878 -750  8881 0

c  1+1 --> 2
c    (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0 ∧  p_750) -> (-b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0)
c  in CNF:
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_2
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨  b^{5, 151}_1
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ -p_750 ∨ -b^{5, 151}_0
c  in DIMACS:
 8876  8877 -8878 -750 -8879 0
 8876  8877 -8878 -750  8880 0
 8876  8877 -8878 -750 -8881 0

c  2+1 --> break 
c    (-b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧  p_750) -> break
c  in CNF:
c     b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 8876 -8877  8878 -750 1162 0


c  2-1 --> 1
c    (-b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧ -p_750) -> (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0)
c  in CNF:
c     b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_2
c     b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_1
c     b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨  b^{5, 151}_0
c  in DIMACS:
 8876 -8877  8878  750 -8879 0
 8876 -8877  8878  750 -8880 0
 8876 -8877  8878  750  8881 0

c  1-1 --> 0
c    (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0 ∧ -p_750) -> (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧ -b^{5, 151}_0)
c  in CNF:
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_2
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_1
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_0
c  in DIMACS:
 8876  8877 -8878  750 -8879 0
 8876  8877 -8878  750 -8880 0
 8876  8877 -8878  750 -8881 0

c  0-1 --> -1
c    (-b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧ -p_750) -> ( b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0)
c  in CNF:
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨  b^{5, 151}_2
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_1
c     b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨  b^{5, 151}_0
c  in DIMACS:
 8876  8877  8878  750  8879 0
 8876  8877  8878  750 -8880 0
 8876  8877  8878  750  8881 0

c  -1-1 --> -2
c    ( b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧  b^{5, 150}_0 ∧ -p_750) -> ( b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0)
c  in CNF:
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨  b^{5, 151}_2
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨  b^{5, 151}_1
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨  p_750 ∨ -b^{5, 151}_0
c  in DIMACS:
-8876  8877 -8878  750  8879 0
-8876  8877 -8878  750  8880 0
-8876  8877 -8878  750 -8881 0

c  -2-1 --> break 
c    ( b^{5, 150}_2 ∧  b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨  b^{5, 150}_0 ∨  p_750 ∨ break
c  in DIMACS:
-8876 -8877  8878  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 150}_2 ∧ -b^{5, 150}_1 ∧ -b^{5, 150}_0 ∧ true) 
c  in CNF:
c    -b^{5, 150}_2 ∨  b^{5, 150}_1 ∨  b^{5, 150}_0 ∨ false 
c  in DIMACS:
-8876  8877  8878  0

c  3 does not represent an automaton state.
c    -(-b^{5, 150}_2 ∧  b^{5, 150}_1 ∧  b^{5, 150}_0 ∧ true) 
c  in CNF:
c     b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ false 
c  in DIMACS:
 8876 -8877 -8878  0
c  -3 does not represent an automaton state.
c    -( b^{5, 150}_2 ∧  b^{5, 150}_1 ∧  b^{5, 150}_0 ∧ true) 
c  in CNF:
c    -b^{5, 150}_2 ∨ -b^{5, 150}_1 ∨ -b^{5, 150}_0 ∨ false 
c  in DIMACS:
-8876 -8877 -8878  0

c i = 151
c  -2+1 --> -1
c    ( b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧  p_755) -> ( b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0)
c  in CNF:
c    -b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨  b^{5, 152}_2
c    -b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_1
c    -b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨  b^{5, 152}_0
c  in DIMACS:
-8879 -8880  8881 -755  8882 0
-8879 -8880  8881 -755 -8883 0
-8879 -8880  8881 -755  8884 0

c  -1+1 --> 0
c    ( b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0 ∧  p_755) -> (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧ -b^{5, 152}_0)
c  in CNF:
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_2
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_1
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_0
c  in DIMACS:
-8879  8880 -8881 -755 -8882 0
-8879  8880 -8881 -755 -8883 0
-8879  8880 -8881 -755 -8884 0

c  0+1 --> 1
c    (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧  p_755) -> (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0)
c  in CNF:
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_2
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_1
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨  b^{5, 152}_0
c  in DIMACS:
 8879  8880  8881 -755 -8882 0
 8879  8880  8881 -755 -8883 0
 8879  8880  8881 -755  8884 0

c  1+1 --> 2
c    (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0 ∧  p_755) -> (-b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0)
c  in CNF:
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_2
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨  b^{5, 152}_1
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ -p_755 ∨ -b^{5, 152}_0
c  in DIMACS:
 8879  8880 -8881 -755 -8882 0
 8879  8880 -8881 -755  8883 0
 8879  8880 -8881 -755 -8884 0

c  2+1 --> break 
c    (-b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧  p_755) -> break
c  in CNF:
c     b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ -p_755 ∨ break
c  in DIMACS:
 8879 -8880  8881 -755 1162 0


c  2-1 --> 1
c    (-b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧ -p_755) -> (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0)
c  in CNF:
c     b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_2
c     b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_1
c     b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨  b^{5, 152}_0
c  in DIMACS:
 8879 -8880  8881  755 -8882 0
 8879 -8880  8881  755 -8883 0
 8879 -8880  8881  755  8884 0

c  1-1 --> 0
c    (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0 ∧ -p_755) -> (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧ -b^{5, 152}_0)
c  in CNF:
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_2
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_1
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_0
c  in DIMACS:
 8879  8880 -8881  755 -8882 0
 8879  8880 -8881  755 -8883 0
 8879  8880 -8881  755 -8884 0

c  0-1 --> -1
c    (-b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧ -p_755) -> ( b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0)
c  in CNF:
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨  b^{5, 152}_2
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_1
c     b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨  b^{5, 152}_0
c  in DIMACS:
 8879  8880  8881  755  8882 0
 8879  8880  8881  755 -8883 0
 8879  8880  8881  755  8884 0

c  -1-1 --> -2
c    ( b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧  b^{5, 151}_0 ∧ -p_755) -> ( b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0)
c  in CNF:
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨  b^{5, 152}_2
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨  b^{5, 152}_1
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨  p_755 ∨ -b^{5, 152}_0
c  in DIMACS:
-8879  8880 -8881  755  8882 0
-8879  8880 -8881  755  8883 0
-8879  8880 -8881  755 -8884 0

c  -2-1 --> break 
c    ( b^{5, 151}_2 ∧  b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧ -p_755) -> break
c  in CNF:
c    -b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨  b^{5, 151}_0 ∨  p_755 ∨ break
c  in DIMACS:
-8879 -8880  8881  755 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 151}_2 ∧ -b^{5, 151}_1 ∧ -b^{5, 151}_0 ∧ true) 
c  in CNF:
c    -b^{5, 151}_2 ∨  b^{5, 151}_1 ∨  b^{5, 151}_0 ∨ false 
c  in DIMACS:
-8879  8880  8881  0

c  3 does not represent an automaton state.
c    -(-b^{5, 151}_2 ∧  b^{5, 151}_1 ∧  b^{5, 151}_0 ∧ true) 
c  in CNF:
c     b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ false 
c  in DIMACS:
 8879 -8880 -8881  0
c  -3 does not represent an automaton state.
c    -( b^{5, 151}_2 ∧  b^{5, 151}_1 ∧  b^{5, 151}_0 ∧ true) 
c  in CNF:
c    -b^{5, 151}_2 ∨ -b^{5, 151}_1 ∨ -b^{5, 151}_0 ∨ false 
c  in DIMACS:
-8879 -8880 -8881  0

c i = 152
c  -2+1 --> -1
c    ( b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧  p_760) -> ( b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0)
c  in CNF:
c    -b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨  b^{5, 153}_2
c    -b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_1
c    -b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨  b^{5, 153}_0
c  in DIMACS:
-8882 -8883  8884 -760  8885 0
-8882 -8883  8884 -760 -8886 0
-8882 -8883  8884 -760  8887 0

c  -1+1 --> 0
c    ( b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0 ∧  p_760) -> (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧ -b^{5, 153}_0)
c  in CNF:
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_2
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_1
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_0
c  in DIMACS:
-8882  8883 -8884 -760 -8885 0
-8882  8883 -8884 -760 -8886 0
-8882  8883 -8884 -760 -8887 0

c  0+1 --> 1
c    (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧  p_760) -> (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0)
c  in CNF:
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_2
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_1
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨  b^{5, 153}_0
c  in DIMACS:
 8882  8883  8884 -760 -8885 0
 8882  8883  8884 -760 -8886 0
 8882  8883  8884 -760  8887 0

c  1+1 --> 2
c    (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0 ∧  p_760) -> (-b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0)
c  in CNF:
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_2
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨  b^{5, 153}_1
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ -p_760 ∨ -b^{5, 153}_0
c  in DIMACS:
 8882  8883 -8884 -760 -8885 0
 8882  8883 -8884 -760  8886 0
 8882  8883 -8884 -760 -8887 0

c  2+1 --> break 
c    (-b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧  p_760) -> break
c  in CNF:
c     b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 8882 -8883  8884 -760 1162 0


c  2-1 --> 1
c    (-b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧ -p_760) -> (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0)
c  in CNF:
c     b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_2
c     b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_1
c     b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨  b^{5, 153}_0
c  in DIMACS:
 8882 -8883  8884  760 -8885 0
 8882 -8883  8884  760 -8886 0
 8882 -8883  8884  760  8887 0

c  1-1 --> 0
c    (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0 ∧ -p_760) -> (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧ -b^{5, 153}_0)
c  in CNF:
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_2
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_1
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_0
c  in DIMACS:
 8882  8883 -8884  760 -8885 0
 8882  8883 -8884  760 -8886 0
 8882  8883 -8884  760 -8887 0

c  0-1 --> -1
c    (-b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧ -p_760) -> ( b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0)
c  in CNF:
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨  b^{5, 153}_2
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_1
c     b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨  b^{5, 153}_0
c  in DIMACS:
 8882  8883  8884  760  8885 0
 8882  8883  8884  760 -8886 0
 8882  8883  8884  760  8887 0

c  -1-1 --> -2
c    ( b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧  b^{5, 152}_0 ∧ -p_760) -> ( b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0)
c  in CNF:
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨  b^{5, 153}_2
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨  b^{5, 153}_1
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨  p_760 ∨ -b^{5, 153}_0
c  in DIMACS:
-8882  8883 -8884  760  8885 0
-8882  8883 -8884  760  8886 0
-8882  8883 -8884  760 -8887 0

c  -2-1 --> break 
c    ( b^{5, 152}_2 ∧  b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨  b^{5, 152}_0 ∨  p_760 ∨ break
c  in DIMACS:
-8882 -8883  8884  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 152}_2 ∧ -b^{5, 152}_1 ∧ -b^{5, 152}_0 ∧ true) 
c  in CNF:
c    -b^{5, 152}_2 ∨  b^{5, 152}_1 ∨  b^{5, 152}_0 ∨ false 
c  in DIMACS:
-8882  8883  8884  0

c  3 does not represent an automaton state.
c    -(-b^{5, 152}_2 ∧  b^{5, 152}_1 ∧  b^{5, 152}_0 ∧ true) 
c  in CNF:
c     b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ false 
c  in DIMACS:
 8882 -8883 -8884  0
c  -3 does not represent an automaton state.
c    -( b^{5, 152}_2 ∧  b^{5, 152}_1 ∧  b^{5, 152}_0 ∧ true) 
c  in CNF:
c    -b^{5, 152}_2 ∨ -b^{5, 152}_1 ∨ -b^{5, 152}_0 ∨ false 
c  in DIMACS:
-8882 -8883 -8884  0

c i = 153
c  -2+1 --> -1
c    ( b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧  p_765) -> ( b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0)
c  in CNF:
c    -b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨  b^{5, 154}_2
c    -b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_1
c    -b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨  b^{5, 154}_0
c  in DIMACS:
-8885 -8886  8887 -765  8888 0
-8885 -8886  8887 -765 -8889 0
-8885 -8886  8887 -765  8890 0

c  -1+1 --> 0
c    ( b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0 ∧  p_765) -> (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧ -b^{5, 154}_0)
c  in CNF:
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_2
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_1
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_0
c  in DIMACS:
-8885  8886 -8887 -765 -8888 0
-8885  8886 -8887 -765 -8889 0
-8885  8886 -8887 -765 -8890 0

c  0+1 --> 1
c    (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧  p_765) -> (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0)
c  in CNF:
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_2
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_1
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨  b^{5, 154}_0
c  in DIMACS:
 8885  8886  8887 -765 -8888 0
 8885  8886  8887 -765 -8889 0
 8885  8886  8887 -765  8890 0

c  1+1 --> 2
c    (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0 ∧  p_765) -> (-b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0)
c  in CNF:
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_2
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨  b^{5, 154}_1
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ -p_765 ∨ -b^{5, 154}_0
c  in DIMACS:
 8885  8886 -8887 -765 -8888 0
 8885  8886 -8887 -765  8889 0
 8885  8886 -8887 -765 -8890 0

c  2+1 --> break 
c    (-b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧  p_765) -> break
c  in CNF:
c     b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 8885 -8886  8887 -765 1162 0


c  2-1 --> 1
c    (-b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧ -p_765) -> (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0)
c  in CNF:
c     b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_2
c     b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_1
c     b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨  b^{5, 154}_0
c  in DIMACS:
 8885 -8886  8887  765 -8888 0
 8885 -8886  8887  765 -8889 0
 8885 -8886  8887  765  8890 0

c  1-1 --> 0
c    (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0 ∧ -p_765) -> (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧ -b^{5, 154}_0)
c  in CNF:
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_2
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_1
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_0
c  in DIMACS:
 8885  8886 -8887  765 -8888 0
 8885  8886 -8887  765 -8889 0
 8885  8886 -8887  765 -8890 0

c  0-1 --> -1
c    (-b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧ -p_765) -> ( b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0)
c  in CNF:
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨  b^{5, 154}_2
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_1
c     b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨  b^{5, 154}_0
c  in DIMACS:
 8885  8886  8887  765  8888 0
 8885  8886  8887  765 -8889 0
 8885  8886  8887  765  8890 0

c  -1-1 --> -2
c    ( b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧  b^{5, 153}_0 ∧ -p_765) -> ( b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0)
c  in CNF:
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨  b^{5, 154}_2
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨  b^{5, 154}_1
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨  p_765 ∨ -b^{5, 154}_0
c  in DIMACS:
-8885  8886 -8887  765  8888 0
-8885  8886 -8887  765  8889 0
-8885  8886 -8887  765 -8890 0

c  -2-1 --> break 
c    ( b^{5, 153}_2 ∧  b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨  b^{5, 153}_0 ∨  p_765 ∨ break
c  in DIMACS:
-8885 -8886  8887  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 153}_2 ∧ -b^{5, 153}_1 ∧ -b^{5, 153}_0 ∧ true) 
c  in CNF:
c    -b^{5, 153}_2 ∨  b^{5, 153}_1 ∨  b^{5, 153}_0 ∨ false 
c  in DIMACS:
-8885  8886  8887  0

c  3 does not represent an automaton state.
c    -(-b^{5, 153}_2 ∧  b^{5, 153}_1 ∧  b^{5, 153}_0 ∧ true) 
c  in CNF:
c     b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ false 
c  in DIMACS:
 8885 -8886 -8887  0
c  -3 does not represent an automaton state.
c    -( b^{5, 153}_2 ∧  b^{5, 153}_1 ∧  b^{5, 153}_0 ∧ true) 
c  in CNF:
c    -b^{5, 153}_2 ∨ -b^{5, 153}_1 ∨ -b^{5, 153}_0 ∨ false 
c  in DIMACS:
-8885 -8886 -8887  0

c i = 154
c  -2+1 --> -1
c    ( b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧  p_770) -> ( b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0)
c  in CNF:
c    -b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨  b^{5, 155}_2
c    -b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_1
c    -b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨  b^{5, 155}_0
c  in DIMACS:
-8888 -8889  8890 -770  8891 0
-8888 -8889  8890 -770 -8892 0
-8888 -8889  8890 -770  8893 0

c  -1+1 --> 0
c    ( b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0 ∧  p_770) -> (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧ -b^{5, 155}_0)
c  in CNF:
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_2
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_1
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_0
c  in DIMACS:
-8888  8889 -8890 -770 -8891 0
-8888  8889 -8890 -770 -8892 0
-8888  8889 -8890 -770 -8893 0

c  0+1 --> 1
c    (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧  p_770) -> (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0)
c  in CNF:
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_2
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_1
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨  b^{5, 155}_0
c  in DIMACS:
 8888  8889  8890 -770 -8891 0
 8888  8889  8890 -770 -8892 0
 8888  8889  8890 -770  8893 0

c  1+1 --> 2
c    (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0 ∧  p_770) -> (-b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0)
c  in CNF:
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_2
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨  b^{5, 155}_1
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ -p_770 ∨ -b^{5, 155}_0
c  in DIMACS:
 8888  8889 -8890 -770 -8891 0
 8888  8889 -8890 -770  8892 0
 8888  8889 -8890 -770 -8893 0

c  2+1 --> break 
c    (-b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧  p_770) -> break
c  in CNF:
c     b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 8888 -8889  8890 -770 1162 0


c  2-1 --> 1
c    (-b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧ -p_770) -> (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0)
c  in CNF:
c     b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_2
c     b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_1
c     b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨  b^{5, 155}_0
c  in DIMACS:
 8888 -8889  8890  770 -8891 0
 8888 -8889  8890  770 -8892 0
 8888 -8889  8890  770  8893 0

c  1-1 --> 0
c    (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0 ∧ -p_770) -> (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧ -b^{5, 155}_0)
c  in CNF:
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_2
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_1
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_0
c  in DIMACS:
 8888  8889 -8890  770 -8891 0
 8888  8889 -8890  770 -8892 0
 8888  8889 -8890  770 -8893 0

c  0-1 --> -1
c    (-b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧ -p_770) -> ( b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0)
c  in CNF:
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨  b^{5, 155}_2
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_1
c     b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨  b^{5, 155}_0
c  in DIMACS:
 8888  8889  8890  770  8891 0
 8888  8889  8890  770 -8892 0
 8888  8889  8890  770  8893 0

c  -1-1 --> -2
c    ( b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧  b^{5, 154}_0 ∧ -p_770) -> ( b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0)
c  in CNF:
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨  b^{5, 155}_2
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨  b^{5, 155}_1
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨  p_770 ∨ -b^{5, 155}_0
c  in DIMACS:
-8888  8889 -8890  770  8891 0
-8888  8889 -8890  770  8892 0
-8888  8889 -8890  770 -8893 0

c  -2-1 --> break 
c    ( b^{5, 154}_2 ∧  b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨  b^{5, 154}_0 ∨  p_770 ∨ break
c  in DIMACS:
-8888 -8889  8890  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 154}_2 ∧ -b^{5, 154}_1 ∧ -b^{5, 154}_0 ∧ true) 
c  in CNF:
c    -b^{5, 154}_2 ∨  b^{5, 154}_1 ∨  b^{5, 154}_0 ∨ false 
c  in DIMACS:
-8888  8889  8890  0

c  3 does not represent an automaton state.
c    -(-b^{5, 154}_2 ∧  b^{5, 154}_1 ∧  b^{5, 154}_0 ∧ true) 
c  in CNF:
c     b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ false 
c  in DIMACS:
 8888 -8889 -8890  0
c  -3 does not represent an automaton state.
c    -( b^{5, 154}_2 ∧  b^{5, 154}_1 ∧  b^{5, 154}_0 ∧ true) 
c  in CNF:
c    -b^{5, 154}_2 ∨ -b^{5, 154}_1 ∨ -b^{5, 154}_0 ∨ false 
c  in DIMACS:
-8888 -8889 -8890  0

c i = 155
c  -2+1 --> -1
c    ( b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧  p_775) -> ( b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0)
c  in CNF:
c    -b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨  b^{5, 156}_2
c    -b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_1
c    -b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨  b^{5, 156}_0
c  in DIMACS:
-8891 -8892  8893 -775  8894 0
-8891 -8892  8893 -775 -8895 0
-8891 -8892  8893 -775  8896 0

c  -1+1 --> 0
c    ( b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0 ∧  p_775) -> (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧ -b^{5, 156}_0)
c  in CNF:
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_2
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_1
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_0
c  in DIMACS:
-8891  8892 -8893 -775 -8894 0
-8891  8892 -8893 -775 -8895 0
-8891  8892 -8893 -775 -8896 0

c  0+1 --> 1
c    (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧  p_775) -> (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0)
c  in CNF:
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_2
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_1
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨  b^{5, 156}_0
c  in DIMACS:
 8891  8892  8893 -775 -8894 0
 8891  8892  8893 -775 -8895 0
 8891  8892  8893 -775  8896 0

c  1+1 --> 2
c    (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0 ∧  p_775) -> (-b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0)
c  in CNF:
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_2
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨  b^{5, 156}_1
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ -p_775 ∨ -b^{5, 156}_0
c  in DIMACS:
 8891  8892 -8893 -775 -8894 0
 8891  8892 -8893 -775  8895 0
 8891  8892 -8893 -775 -8896 0

c  2+1 --> break 
c    (-b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧  p_775) -> break
c  in CNF:
c     b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ -p_775 ∨ break
c  in DIMACS:
 8891 -8892  8893 -775 1162 0


c  2-1 --> 1
c    (-b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧ -p_775) -> (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0)
c  in CNF:
c     b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_2
c     b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_1
c     b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨  b^{5, 156}_0
c  in DIMACS:
 8891 -8892  8893  775 -8894 0
 8891 -8892  8893  775 -8895 0
 8891 -8892  8893  775  8896 0

c  1-1 --> 0
c    (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0 ∧ -p_775) -> (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧ -b^{5, 156}_0)
c  in CNF:
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_2
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_1
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_0
c  in DIMACS:
 8891  8892 -8893  775 -8894 0
 8891  8892 -8893  775 -8895 0
 8891  8892 -8893  775 -8896 0

c  0-1 --> -1
c    (-b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧ -p_775) -> ( b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0)
c  in CNF:
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨  b^{5, 156}_2
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_1
c     b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨  b^{5, 156}_0
c  in DIMACS:
 8891  8892  8893  775  8894 0
 8891  8892  8893  775 -8895 0
 8891  8892  8893  775  8896 0

c  -1-1 --> -2
c    ( b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧  b^{5, 155}_0 ∧ -p_775) -> ( b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0)
c  in CNF:
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨  b^{5, 156}_2
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨  b^{5, 156}_1
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨  p_775 ∨ -b^{5, 156}_0
c  in DIMACS:
-8891  8892 -8893  775  8894 0
-8891  8892 -8893  775  8895 0
-8891  8892 -8893  775 -8896 0

c  -2-1 --> break 
c    ( b^{5, 155}_2 ∧  b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧ -p_775) -> break
c  in CNF:
c    -b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨  b^{5, 155}_0 ∨  p_775 ∨ break
c  in DIMACS:
-8891 -8892  8893  775 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 155}_2 ∧ -b^{5, 155}_1 ∧ -b^{5, 155}_0 ∧ true) 
c  in CNF:
c    -b^{5, 155}_2 ∨  b^{5, 155}_1 ∨  b^{5, 155}_0 ∨ false 
c  in DIMACS:
-8891  8892  8893  0

c  3 does not represent an automaton state.
c    -(-b^{5, 155}_2 ∧  b^{5, 155}_1 ∧  b^{5, 155}_0 ∧ true) 
c  in CNF:
c     b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ false 
c  in DIMACS:
 8891 -8892 -8893  0
c  -3 does not represent an automaton state.
c    -( b^{5, 155}_2 ∧  b^{5, 155}_1 ∧  b^{5, 155}_0 ∧ true) 
c  in CNF:
c    -b^{5, 155}_2 ∨ -b^{5, 155}_1 ∨ -b^{5, 155}_0 ∨ false 
c  in DIMACS:
-8891 -8892 -8893  0

c i = 156
c  -2+1 --> -1
c    ( b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧  p_780) -> ( b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0)
c  in CNF:
c    -b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨  b^{5, 157}_2
c    -b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_1
c    -b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨  b^{5, 157}_0
c  in DIMACS:
-8894 -8895  8896 -780  8897 0
-8894 -8895  8896 -780 -8898 0
-8894 -8895  8896 -780  8899 0

c  -1+1 --> 0
c    ( b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0 ∧  p_780) -> (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧ -b^{5, 157}_0)
c  in CNF:
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_2
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_1
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_0
c  in DIMACS:
-8894  8895 -8896 -780 -8897 0
-8894  8895 -8896 -780 -8898 0
-8894  8895 -8896 -780 -8899 0

c  0+1 --> 1
c    (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧  p_780) -> (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0)
c  in CNF:
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_2
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_1
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨  b^{5, 157}_0
c  in DIMACS:
 8894  8895  8896 -780 -8897 0
 8894  8895  8896 -780 -8898 0
 8894  8895  8896 -780  8899 0

c  1+1 --> 2
c    (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0 ∧  p_780) -> (-b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0)
c  in CNF:
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_2
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨  b^{5, 157}_1
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ -p_780 ∨ -b^{5, 157}_0
c  in DIMACS:
 8894  8895 -8896 -780 -8897 0
 8894  8895 -8896 -780  8898 0
 8894  8895 -8896 -780 -8899 0

c  2+1 --> break 
c    (-b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧  p_780) -> break
c  in CNF:
c     b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 8894 -8895  8896 -780 1162 0


c  2-1 --> 1
c    (-b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧ -p_780) -> (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0)
c  in CNF:
c     b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_2
c     b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_1
c     b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨  b^{5, 157}_0
c  in DIMACS:
 8894 -8895  8896  780 -8897 0
 8894 -8895  8896  780 -8898 0
 8894 -8895  8896  780  8899 0

c  1-1 --> 0
c    (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0 ∧ -p_780) -> (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧ -b^{5, 157}_0)
c  in CNF:
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_2
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_1
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_0
c  in DIMACS:
 8894  8895 -8896  780 -8897 0
 8894  8895 -8896  780 -8898 0
 8894  8895 -8896  780 -8899 0

c  0-1 --> -1
c    (-b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧ -p_780) -> ( b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0)
c  in CNF:
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨  b^{5, 157}_2
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_1
c     b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨  b^{5, 157}_0
c  in DIMACS:
 8894  8895  8896  780  8897 0
 8894  8895  8896  780 -8898 0
 8894  8895  8896  780  8899 0

c  -1-1 --> -2
c    ( b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧  b^{5, 156}_0 ∧ -p_780) -> ( b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0)
c  in CNF:
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨  b^{5, 157}_2
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨  b^{5, 157}_1
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨  p_780 ∨ -b^{5, 157}_0
c  in DIMACS:
-8894  8895 -8896  780  8897 0
-8894  8895 -8896  780  8898 0
-8894  8895 -8896  780 -8899 0

c  -2-1 --> break 
c    ( b^{5, 156}_2 ∧  b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨  b^{5, 156}_0 ∨  p_780 ∨ break
c  in DIMACS:
-8894 -8895  8896  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 156}_2 ∧ -b^{5, 156}_1 ∧ -b^{5, 156}_0 ∧ true) 
c  in CNF:
c    -b^{5, 156}_2 ∨  b^{5, 156}_1 ∨  b^{5, 156}_0 ∨ false 
c  in DIMACS:
-8894  8895  8896  0

c  3 does not represent an automaton state.
c    -(-b^{5, 156}_2 ∧  b^{5, 156}_1 ∧  b^{5, 156}_0 ∧ true) 
c  in CNF:
c     b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ false 
c  in DIMACS:
 8894 -8895 -8896  0
c  -3 does not represent an automaton state.
c    -( b^{5, 156}_2 ∧  b^{5, 156}_1 ∧  b^{5, 156}_0 ∧ true) 
c  in CNF:
c    -b^{5, 156}_2 ∨ -b^{5, 156}_1 ∨ -b^{5, 156}_0 ∨ false 
c  in DIMACS:
-8894 -8895 -8896  0

c i = 157
c  -2+1 --> -1
c    ( b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧  p_785) -> ( b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0)
c  in CNF:
c    -b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨  b^{5, 158}_2
c    -b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_1
c    -b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨  b^{5, 158}_0
c  in DIMACS:
-8897 -8898  8899 -785  8900 0
-8897 -8898  8899 -785 -8901 0
-8897 -8898  8899 -785  8902 0

c  -1+1 --> 0
c    ( b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0 ∧  p_785) -> (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧ -b^{5, 158}_0)
c  in CNF:
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_2
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_1
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_0
c  in DIMACS:
-8897  8898 -8899 -785 -8900 0
-8897  8898 -8899 -785 -8901 0
-8897  8898 -8899 -785 -8902 0

c  0+1 --> 1
c    (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧  p_785) -> (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0)
c  in CNF:
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_2
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_1
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨  b^{5, 158}_0
c  in DIMACS:
 8897  8898  8899 -785 -8900 0
 8897  8898  8899 -785 -8901 0
 8897  8898  8899 -785  8902 0

c  1+1 --> 2
c    (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0 ∧  p_785) -> (-b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0)
c  in CNF:
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_2
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨  b^{5, 158}_1
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ -p_785 ∨ -b^{5, 158}_0
c  in DIMACS:
 8897  8898 -8899 -785 -8900 0
 8897  8898 -8899 -785  8901 0
 8897  8898 -8899 -785 -8902 0

c  2+1 --> break 
c    (-b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧  p_785) -> break
c  in CNF:
c     b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ -p_785 ∨ break
c  in DIMACS:
 8897 -8898  8899 -785 1162 0


c  2-1 --> 1
c    (-b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧ -p_785) -> (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0)
c  in CNF:
c     b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_2
c     b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_1
c     b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨  b^{5, 158}_0
c  in DIMACS:
 8897 -8898  8899  785 -8900 0
 8897 -8898  8899  785 -8901 0
 8897 -8898  8899  785  8902 0

c  1-1 --> 0
c    (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0 ∧ -p_785) -> (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧ -b^{5, 158}_0)
c  in CNF:
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_2
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_1
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_0
c  in DIMACS:
 8897  8898 -8899  785 -8900 0
 8897  8898 -8899  785 -8901 0
 8897  8898 -8899  785 -8902 0

c  0-1 --> -1
c    (-b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧ -p_785) -> ( b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0)
c  in CNF:
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨  b^{5, 158}_2
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_1
c     b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨  b^{5, 158}_0
c  in DIMACS:
 8897  8898  8899  785  8900 0
 8897  8898  8899  785 -8901 0
 8897  8898  8899  785  8902 0

c  -1-1 --> -2
c    ( b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧  b^{5, 157}_0 ∧ -p_785) -> ( b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0)
c  in CNF:
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨  b^{5, 158}_2
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨  b^{5, 158}_1
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨  p_785 ∨ -b^{5, 158}_0
c  in DIMACS:
-8897  8898 -8899  785  8900 0
-8897  8898 -8899  785  8901 0
-8897  8898 -8899  785 -8902 0

c  -2-1 --> break 
c    ( b^{5, 157}_2 ∧  b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧ -p_785) -> break
c  in CNF:
c    -b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨  b^{5, 157}_0 ∨  p_785 ∨ break
c  in DIMACS:
-8897 -8898  8899  785 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 157}_2 ∧ -b^{5, 157}_1 ∧ -b^{5, 157}_0 ∧ true) 
c  in CNF:
c    -b^{5, 157}_2 ∨  b^{5, 157}_1 ∨  b^{5, 157}_0 ∨ false 
c  in DIMACS:
-8897  8898  8899  0

c  3 does not represent an automaton state.
c    -(-b^{5, 157}_2 ∧  b^{5, 157}_1 ∧  b^{5, 157}_0 ∧ true) 
c  in CNF:
c     b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ false 
c  in DIMACS:
 8897 -8898 -8899  0
c  -3 does not represent an automaton state.
c    -( b^{5, 157}_2 ∧  b^{5, 157}_1 ∧  b^{5, 157}_0 ∧ true) 
c  in CNF:
c    -b^{5, 157}_2 ∨ -b^{5, 157}_1 ∨ -b^{5, 157}_0 ∨ false 
c  in DIMACS:
-8897 -8898 -8899  0

c i = 158
c  -2+1 --> -1
c    ( b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧  p_790) -> ( b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0)
c  in CNF:
c    -b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨  b^{5, 159}_2
c    -b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_1
c    -b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨  b^{5, 159}_0
c  in DIMACS:
-8900 -8901  8902 -790  8903 0
-8900 -8901  8902 -790 -8904 0
-8900 -8901  8902 -790  8905 0

c  -1+1 --> 0
c    ( b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0 ∧  p_790) -> (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧ -b^{5, 159}_0)
c  in CNF:
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_2
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_1
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_0
c  in DIMACS:
-8900  8901 -8902 -790 -8903 0
-8900  8901 -8902 -790 -8904 0
-8900  8901 -8902 -790 -8905 0

c  0+1 --> 1
c    (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧  p_790) -> (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0)
c  in CNF:
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_2
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_1
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨  b^{5, 159}_0
c  in DIMACS:
 8900  8901  8902 -790 -8903 0
 8900  8901  8902 -790 -8904 0
 8900  8901  8902 -790  8905 0

c  1+1 --> 2
c    (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0 ∧  p_790) -> (-b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0)
c  in CNF:
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_2
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨  b^{5, 159}_1
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ -p_790 ∨ -b^{5, 159}_0
c  in DIMACS:
 8900  8901 -8902 -790 -8903 0
 8900  8901 -8902 -790  8904 0
 8900  8901 -8902 -790 -8905 0

c  2+1 --> break 
c    (-b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧  p_790) -> break
c  in CNF:
c     b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 8900 -8901  8902 -790 1162 0


c  2-1 --> 1
c    (-b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧ -p_790) -> (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0)
c  in CNF:
c     b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_2
c     b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_1
c     b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨  b^{5, 159}_0
c  in DIMACS:
 8900 -8901  8902  790 -8903 0
 8900 -8901  8902  790 -8904 0
 8900 -8901  8902  790  8905 0

c  1-1 --> 0
c    (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0 ∧ -p_790) -> (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧ -b^{5, 159}_0)
c  in CNF:
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_2
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_1
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_0
c  in DIMACS:
 8900  8901 -8902  790 -8903 0
 8900  8901 -8902  790 -8904 0
 8900  8901 -8902  790 -8905 0

c  0-1 --> -1
c    (-b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧ -p_790) -> ( b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0)
c  in CNF:
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨  b^{5, 159}_2
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_1
c     b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨  b^{5, 159}_0
c  in DIMACS:
 8900  8901  8902  790  8903 0
 8900  8901  8902  790 -8904 0
 8900  8901  8902  790  8905 0

c  -1-1 --> -2
c    ( b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧  b^{5, 158}_0 ∧ -p_790) -> ( b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0)
c  in CNF:
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨  b^{5, 159}_2
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨  b^{5, 159}_1
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨  p_790 ∨ -b^{5, 159}_0
c  in DIMACS:
-8900  8901 -8902  790  8903 0
-8900  8901 -8902  790  8904 0
-8900  8901 -8902  790 -8905 0

c  -2-1 --> break 
c    ( b^{5, 158}_2 ∧  b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨  b^{5, 158}_0 ∨  p_790 ∨ break
c  in DIMACS:
-8900 -8901  8902  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 158}_2 ∧ -b^{5, 158}_1 ∧ -b^{5, 158}_0 ∧ true) 
c  in CNF:
c    -b^{5, 158}_2 ∨  b^{5, 158}_1 ∨  b^{5, 158}_0 ∨ false 
c  in DIMACS:
-8900  8901  8902  0

c  3 does not represent an automaton state.
c    -(-b^{5, 158}_2 ∧  b^{5, 158}_1 ∧  b^{5, 158}_0 ∧ true) 
c  in CNF:
c     b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ false 
c  in DIMACS:
 8900 -8901 -8902  0
c  -3 does not represent an automaton state.
c    -( b^{5, 158}_2 ∧  b^{5, 158}_1 ∧  b^{5, 158}_0 ∧ true) 
c  in CNF:
c    -b^{5, 158}_2 ∨ -b^{5, 158}_1 ∨ -b^{5, 158}_0 ∨ false 
c  in DIMACS:
-8900 -8901 -8902  0

c i = 159
c  -2+1 --> -1
c    ( b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧  p_795) -> ( b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0)
c  in CNF:
c    -b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨  b^{5, 160}_2
c    -b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_1
c    -b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨  b^{5, 160}_0
c  in DIMACS:
-8903 -8904  8905 -795  8906 0
-8903 -8904  8905 -795 -8907 0
-8903 -8904  8905 -795  8908 0

c  -1+1 --> 0
c    ( b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0 ∧  p_795) -> (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧ -b^{5, 160}_0)
c  in CNF:
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_2
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_1
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_0
c  in DIMACS:
-8903  8904 -8905 -795 -8906 0
-8903  8904 -8905 -795 -8907 0
-8903  8904 -8905 -795 -8908 0

c  0+1 --> 1
c    (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧  p_795) -> (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0)
c  in CNF:
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_2
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_1
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨  b^{5, 160}_0
c  in DIMACS:
 8903  8904  8905 -795 -8906 0
 8903  8904  8905 -795 -8907 0
 8903  8904  8905 -795  8908 0

c  1+1 --> 2
c    (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0 ∧  p_795) -> (-b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0)
c  in CNF:
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_2
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨  b^{5, 160}_1
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ -p_795 ∨ -b^{5, 160}_0
c  in DIMACS:
 8903  8904 -8905 -795 -8906 0
 8903  8904 -8905 -795  8907 0
 8903  8904 -8905 -795 -8908 0

c  2+1 --> break 
c    (-b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧  p_795) -> break
c  in CNF:
c     b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 8903 -8904  8905 -795 1162 0


c  2-1 --> 1
c    (-b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧ -p_795) -> (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0)
c  in CNF:
c     b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_2
c     b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_1
c     b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨  b^{5, 160}_0
c  in DIMACS:
 8903 -8904  8905  795 -8906 0
 8903 -8904  8905  795 -8907 0
 8903 -8904  8905  795  8908 0

c  1-1 --> 0
c    (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0 ∧ -p_795) -> (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧ -b^{5, 160}_0)
c  in CNF:
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_2
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_1
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_0
c  in DIMACS:
 8903  8904 -8905  795 -8906 0
 8903  8904 -8905  795 -8907 0
 8903  8904 -8905  795 -8908 0

c  0-1 --> -1
c    (-b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧ -p_795) -> ( b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0)
c  in CNF:
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨  b^{5, 160}_2
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_1
c     b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨  b^{5, 160}_0
c  in DIMACS:
 8903  8904  8905  795  8906 0
 8903  8904  8905  795 -8907 0
 8903  8904  8905  795  8908 0

c  -1-1 --> -2
c    ( b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧  b^{5, 159}_0 ∧ -p_795) -> ( b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0)
c  in CNF:
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨  b^{5, 160}_2
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨  b^{5, 160}_1
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨  p_795 ∨ -b^{5, 160}_0
c  in DIMACS:
-8903  8904 -8905  795  8906 0
-8903  8904 -8905  795  8907 0
-8903  8904 -8905  795 -8908 0

c  -2-1 --> break 
c    ( b^{5, 159}_2 ∧  b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨  b^{5, 159}_0 ∨  p_795 ∨ break
c  in DIMACS:
-8903 -8904  8905  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 159}_2 ∧ -b^{5, 159}_1 ∧ -b^{5, 159}_0 ∧ true) 
c  in CNF:
c    -b^{5, 159}_2 ∨  b^{5, 159}_1 ∨  b^{5, 159}_0 ∨ false 
c  in DIMACS:
-8903  8904  8905  0

c  3 does not represent an automaton state.
c    -(-b^{5, 159}_2 ∧  b^{5, 159}_1 ∧  b^{5, 159}_0 ∧ true) 
c  in CNF:
c     b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ false 
c  in DIMACS:
 8903 -8904 -8905  0
c  -3 does not represent an automaton state.
c    -( b^{5, 159}_2 ∧  b^{5, 159}_1 ∧  b^{5, 159}_0 ∧ true) 
c  in CNF:
c    -b^{5, 159}_2 ∨ -b^{5, 159}_1 ∨ -b^{5, 159}_0 ∨ false 
c  in DIMACS:
-8903 -8904 -8905  0

c i = 160
c  -2+1 --> -1
c    ( b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧  p_800) -> ( b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0)
c  in CNF:
c    -b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨  b^{5, 161}_2
c    -b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_1
c    -b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨  b^{5, 161}_0
c  in DIMACS:
-8906 -8907  8908 -800  8909 0
-8906 -8907  8908 -800 -8910 0
-8906 -8907  8908 -800  8911 0

c  -1+1 --> 0
c    ( b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0 ∧  p_800) -> (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧ -b^{5, 161}_0)
c  in CNF:
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_2
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_1
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_0
c  in DIMACS:
-8906  8907 -8908 -800 -8909 0
-8906  8907 -8908 -800 -8910 0
-8906  8907 -8908 -800 -8911 0

c  0+1 --> 1
c    (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧  p_800) -> (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0)
c  in CNF:
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_2
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_1
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨  b^{5, 161}_0
c  in DIMACS:
 8906  8907  8908 -800 -8909 0
 8906  8907  8908 -800 -8910 0
 8906  8907  8908 -800  8911 0

c  1+1 --> 2
c    (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0 ∧  p_800) -> (-b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0)
c  in CNF:
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_2
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨  b^{5, 161}_1
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ -p_800 ∨ -b^{5, 161}_0
c  in DIMACS:
 8906  8907 -8908 -800 -8909 0
 8906  8907 -8908 -800  8910 0
 8906  8907 -8908 -800 -8911 0

c  2+1 --> break 
c    (-b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧  p_800) -> break
c  in CNF:
c     b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 8906 -8907  8908 -800 1162 0


c  2-1 --> 1
c    (-b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧ -p_800) -> (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0)
c  in CNF:
c     b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_2
c     b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_1
c     b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨  b^{5, 161}_0
c  in DIMACS:
 8906 -8907  8908  800 -8909 0
 8906 -8907  8908  800 -8910 0
 8906 -8907  8908  800  8911 0

c  1-1 --> 0
c    (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0 ∧ -p_800) -> (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧ -b^{5, 161}_0)
c  in CNF:
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_2
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_1
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_0
c  in DIMACS:
 8906  8907 -8908  800 -8909 0
 8906  8907 -8908  800 -8910 0
 8906  8907 -8908  800 -8911 0

c  0-1 --> -1
c    (-b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧ -p_800) -> ( b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0)
c  in CNF:
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨  b^{5, 161}_2
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_1
c     b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨  b^{5, 161}_0
c  in DIMACS:
 8906  8907  8908  800  8909 0
 8906  8907  8908  800 -8910 0
 8906  8907  8908  800  8911 0

c  -1-1 --> -2
c    ( b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧  b^{5, 160}_0 ∧ -p_800) -> ( b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0)
c  in CNF:
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨  b^{5, 161}_2
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨  b^{5, 161}_1
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨  p_800 ∨ -b^{5, 161}_0
c  in DIMACS:
-8906  8907 -8908  800  8909 0
-8906  8907 -8908  800  8910 0
-8906  8907 -8908  800 -8911 0

c  -2-1 --> break 
c    ( b^{5, 160}_2 ∧  b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨  b^{5, 160}_0 ∨  p_800 ∨ break
c  in DIMACS:
-8906 -8907  8908  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 160}_2 ∧ -b^{5, 160}_1 ∧ -b^{5, 160}_0 ∧ true) 
c  in CNF:
c    -b^{5, 160}_2 ∨  b^{5, 160}_1 ∨  b^{5, 160}_0 ∨ false 
c  in DIMACS:
-8906  8907  8908  0

c  3 does not represent an automaton state.
c    -(-b^{5, 160}_2 ∧  b^{5, 160}_1 ∧  b^{5, 160}_0 ∧ true) 
c  in CNF:
c     b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ false 
c  in DIMACS:
 8906 -8907 -8908  0
c  -3 does not represent an automaton state.
c    -( b^{5, 160}_2 ∧  b^{5, 160}_1 ∧  b^{5, 160}_0 ∧ true) 
c  in CNF:
c    -b^{5, 160}_2 ∨ -b^{5, 160}_1 ∨ -b^{5, 160}_0 ∨ false 
c  in DIMACS:
-8906 -8907 -8908  0

c i = 161
c  -2+1 --> -1
c    ( b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧  p_805) -> ( b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0)
c  in CNF:
c    -b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨  b^{5, 162}_2
c    -b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_1
c    -b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨  b^{5, 162}_0
c  in DIMACS:
-8909 -8910  8911 -805  8912 0
-8909 -8910  8911 -805 -8913 0
-8909 -8910  8911 -805  8914 0

c  -1+1 --> 0
c    ( b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0 ∧  p_805) -> (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧ -b^{5, 162}_0)
c  in CNF:
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_2
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_1
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_0
c  in DIMACS:
-8909  8910 -8911 -805 -8912 0
-8909  8910 -8911 -805 -8913 0
-8909  8910 -8911 -805 -8914 0

c  0+1 --> 1
c    (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧  p_805) -> (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0)
c  in CNF:
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_2
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_1
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨  b^{5, 162}_0
c  in DIMACS:
 8909  8910  8911 -805 -8912 0
 8909  8910  8911 -805 -8913 0
 8909  8910  8911 -805  8914 0

c  1+1 --> 2
c    (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0 ∧  p_805) -> (-b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0)
c  in CNF:
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_2
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨  b^{5, 162}_1
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ -p_805 ∨ -b^{5, 162}_0
c  in DIMACS:
 8909  8910 -8911 -805 -8912 0
 8909  8910 -8911 -805  8913 0
 8909  8910 -8911 -805 -8914 0

c  2+1 --> break 
c    (-b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧  p_805) -> break
c  in CNF:
c     b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 8909 -8910  8911 -805 1162 0


c  2-1 --> 1
c    (-b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧ -p_805) -> (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0)
c  in CNF:
c     b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_2
c     b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_1
c     b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨  b^{5, 162}_0
c  in DIMACS:
 8909 -8910  8911  805 -8912 0
 8909 -8910  8911  805 -8913 0
 8909 -8910  8911  805  8914 0

c  1-1 --> 0
c    (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0 ∧ -p_805) -> (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧ -b^{5, 162}_0)
c  in CNF:
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_2
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_1
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_0
c  in DIMACS:
 8909  8910 -8911  805 -8912 0
 8909  8910 -8911  805 -8913 0
 8909  8910 -8911  805 -8914 0

c  0-1 --> -1
c    (-b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧ -p_805) -> ( b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0)
c  in CNF:
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨  b^{5, 162}_2
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_1
c     b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨  b^{5, 162}_0
c  in DIMACS:
 8909  8910  8911  805  8912 0
 8909  8910  8911  805 -8913 0
 8909  8910  8911  805  8914 0

c  -1-1 --> -2
c    ( b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧  b^{5, 161}_0 ∧ -p_805) -> ( b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0)
c  in CNF:
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨  b^{5, 162}_2
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨  b^{5, 162}_1
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨  p_805 ∨ -b^{5, 162}_0
c  in DIMACS:
-8909  8910 -8911  805  8912 0
-8909  8910 -8911  805  8913 0
-8909  8910 -8911  805 -8914 0

c  -2-1 --> break 
c    ( b^{5, 161}_2 ∧  b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨  b^{5, 161}_0 ∨  p_805 ∨ break
c  in DIMACS:
-8909 -8910  8911  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 161}_2 ∧ -b^{5, 161}_1 ∧ -b^{5, 161}_0 ∧ true) 
c  in CNF:
c    -b^{5, 161}_2 ∨  b^{5, 161}_1 ∨  b^{5, 161}_0 ∨ false 
c  in DIMACS:
-8909  8910  8911  0

c  3 does not represent an automaton state.
c    -(-b^{5, 161}_2 ∧  b^{5, 161}_1 ∧  b^{5, 161}_0 ∧ true) 
c  in CNF:
c     b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ false 
c  in DIMACS:
 8909 -8910 -8911  0
c  -3 does not represent an automaton state.
c    -( b^{5, 161}_2 ∧  b^{5, 161}_1 ∧  b^{5, 161}_0 ∧ true) 
c  in CNF:
c    -b^{5, 161}_2 ∨ -b^{5, 161}_1 ∨ -b^{5, 161}_0 ∨ false 
c  in DIMACS:
-8909 -8910 -8911  0

c i = 162
c  -2+1 --> -1
c    ( b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧  p_810) -> ( b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0)
c  in CNF:
c    -b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨  b^{5, 163}_2
c    -b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_1
c    -b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨  b^{5, 163}_0
c  in DIMACS:
-8912 -8913  8914 -810  8915 0
-8912 -8913  8914 -810 -8916 0
-8912 -8913  8914 -810  8917 0

c  -1+1 --> 0
c    ( b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0 ∧  p_810) -> (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧ -b^{5, 163}_0)
c  in CNF:
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_2
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_1
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_0
c  in DIMACS:
-8912  8913 -8914 -810 -8915 0
-8912  8913 -8914 -810 -8916 0
-8912  8913 -8914 -810 -8917 0

c  0+1 --> 1
c    (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧  p_810) -> (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0)
c  in CNF:
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_2
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_1
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨  b^{5, 163}_0
c  in DIMACS:
 8912  8913  8914 -810 -8915 0
 8912  8913  8914 -810 -8916 0
 8912  8913  8914 -810  8917 0

c  1+1 --> 2
c    (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0 ∧  p_810) -> (-b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0)
c  in CNF:
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_2
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨  b^{5, 163}_1
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ -p_810 ∨ -b^{5, 163}_0
c  in DIMACS:
 8912  8913 -8914 -810 -8915 0
 8912  8913 -8914 -810  8916 0
 8912  8913 -8914 -810 -8917 0

c  2+1 --> break 
c    (-b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧  p_810) -> break
c  in CNF:
c     b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 8912 -8913  8914 -810 1162 0


c  2-1 --> 1
c    (-b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧ -p_810) -> (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0)
c  in CNF:
c     b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_2
c     b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_1
c     b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨  b^{5, 163}_0
c  in DIMACS:
 8912 -8913  8914  810 -8915 0
 8912 -8913  8914  810 -8916 0
 8912 -8913  8914  810  8917 0

c  1-1 --> 0
c    (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0 ∧ -p_810) -> (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧ -b^{5, 163}_0)
c  in CNF:
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_2
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_1
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_0
c  in DIMACS:
 8912  8913 -8914  810 -8915 0
 8912  8913 -8914  810 -8916 0
 8912  8913 -8914  810 -8917 0

c  0-1 --> -1
c    (-b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧ -p_810) -> ( b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0)
c  in CNF:
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨  b^{5, 163}_2
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_1
c     b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨  b^{5, 163}_0
c  in DIMACS:
 8912  8913  8914  810  8915 0
 8912  8913  8914  810 -8916 0
 8912  8913  8914  810  8917 0

c  -1-1 --> -2
c    ( b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧  b^{5, 162}_0 ∧ -p_810) -> ( b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0)
c  in CNF:
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨  b^{5, 163}_2
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨  b^{5, 163}_1
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨  p_810 ∨ -b^{5, 163}_0
c  in DIMACS:
-8912  8913 -8914  810  8915 0
-8912  8913 -8914  810  8916 0
-8912  8913 -8914  810 -8917 0

c  -2-1 --> break 
c    ( b^{5, 162}_2 ∧  b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨  b^{5, 162}_0 ∨  p_810 ∨ break
c  in DIMACS:
-8912 -8913  8914  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 162}_2 ∧ -b^{5, 162}_1 ∧ -b^{5, 162}_0 ∧ true) 
c  in CNF:
c    -b^{5, 162}_2 ∨  b^{5, 162}_1 ∨  b^{5, 162}_0 ∨ false 
c  in DIMACS:
-8912  8913  8914  0

c  3 does not represent an automaton state.
c    -(-b^{5, 162}_2 ∧  b^{5, 162}_1 ∧  b^{5, 162}_0 ∧ true) 
c  in CNF:
c     b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ false 
c  in DIMACS:
 8912 -8913 -8914  0
c  -3 does not represent an automaton state.
c    -( b^{5, 162}_2 ∧  b^{5, 162}_1 ∧  b^{5, 162}_0 ∧ true) 
c  in CNF:
c    -b^{5, 162}_2 ∨ -b^{5, 162}_1 ∨ -b^{5, 162}_0 ∨ false 
c  in DIMACS:
-8912 -8913 -8914  0

c i = 163
c  -2+1 --> -1
c    ( b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧  p_815) -> ( b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0)
c  in CNF:
c    -b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨  b^{5, 164}_2
c    -b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_1
c    -b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨  b^{5, 164}_0
c  in DIMACS:
-8915 -8916  8917 -815  8918 0
-8915 -8916  8917 -815 -8919 0
-8915 -8916  8917 -815  8920 0

c  -1+1 --> 0
c    ( b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0 ∧  p_815) -> (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧ -b^{5, 164}_0)
c  in CNF:
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_2
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_1
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_0
c  in DIMACS:
-8915  8916 -8917 -815 -8918 0
-8915  8916 -8917 -815 -8919 0
-8915  8916 -8917 -815 -8920 0

c  0+1 --> 1
c    (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧  p_815) -> (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0)
c  in CNF:
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_2
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_1
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨  b^{5, 164}_0
c  in DIMACS:
 8915  8916  8917 -815 -8918 0
 8915  8916  8917 -815 -8919 0
 8915  8916  8917 -815  8920 0

c  1+1 --> 2
c    (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0 ∧  p_815) -> (-b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0)
c  in CNF:
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_2
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨  b^{5, 164}_1
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ -p_815 ∨ -b^{5, 164}_0
c  in DIMACS:
 8915  8916 -8917 -815 -8918 0
 8915  8916 -8917 -815  8919 0
 8915  8916 -8917 -815 -8920 0

c  2+1 --> break 
c    (-b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧  p_815) -> break
c  in CNF:
c     b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ -p_815 ∨ break
c  in DIMACS:
 8915 -8916  8917 -815 1162 0


c  2-1 --> 1
c    (-b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧ -p_815) -> (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0)
c  in CNF:
c     b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_2
c     b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_1
c     b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨  b^{5, 164}_0
c  in DIMACS:
 8915 -8916  8917  815 -8918 0
 8915 -8916  8917  815 -8919 0
 8915 -8916  8917  815  8920 0

c  1-1 --> 0
c    (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0 ∧ -p_815) -> (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧ -b^{5, 164}_0)
c  in CNF:
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_2
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_1
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_0
c  in DIMACS:
 8915  8916 -8917  815 -8918 0
 8915  8916 -8917  815 -8919 0
 8915  8916 -8917  815 -8920 0

c  0-1 --> -1
c    (-b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧ -p_815) -> ( b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0)
c  in CNF:
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨  b^{5, 164}_2
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_1
c     b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨  b^{5, 164}_0
c  in DIMACS:
 8915  8916  8917  815  8918 0
 8915  8916  8917  815 -8919 0
 8915  8916  8917  815  8920 0

c  -1-1 --> -2
c    ( b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧  b^{5, 163}_0 ∧ -p_815) -> ( b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0)
c  in CNF:
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨  b^{5, 164}_2
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨  b^{5, 164}_1
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨  p_815 ∨ -b^{5, 164}_0
c  in DIMACS:
-8915  8916 -8917  815  8918 0
-8915  8916 -8917  815  8919 0
-8915  8916 -8917  815 -8920 0

c  -2-1 --> break 
c    ( b^{5, 163}_2 ∧  b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧ -p_815) -> break
c  in CNF:
c    -b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨  b^{5, 163}_0 ∨  p_815 ∨ break
c  in DIMACS:
-8915 -8916  8917  815 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 163}_2 ∧ -b^{5, 163}_1 ∧ -b^{5, 163}_0 ∧ true) 
c  in CNF:
c    -b^{5, 163}_2 ∨  b^{5, 163}_1 ∨  b^{5, 163}_0 ∨ false 
c  in DIMACS:
-8915  8916  8917  0

c  3 does not represent an automaton state.
c    -(-b^{5, 163}_2 ∧  b^{5, 163}_1 ∧  b^{5, 163}_0 ∧ true) 
c  in CNF:
c     b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ false 
c  in DIMACS:
 8915 -8916 -8917  0
c  -3 does not represent an automaton state.
c    -( b^{5, 163}_2 ∧  b^{5, 163}_1 ∧  b^{5, 163}_0 ∧ true) 
c  in CNF:
c    -b^{5, 163}_2 ∨ -b^{5, 163}_1 ∨ -b^{5, 163}_0 ∨ false 
c  in DIMACS:
-8915 -8916 -8917  0

c i = 164
c  -2+1 --> -1
c    ( b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧  p_820) -> ( b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0)
c  in CNF:
c    -b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨  b^{5, 165}_2
c    -b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_1
c    -b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨  b^{5, 165}_0
c  in DIMACS:
-8918 -8919  8920 -820  8921 0
-8918 -8919  8920 -820 -8922 0
-8918 -8919  8920 -820  8923 0

c  -1+1 --> 0
c    ( b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0 ∧  p_820) -> (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧ -b^{5, 165}_0)
c  in CNF:
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_2
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_1
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_0
c  in DIMACS:
-8918  8919 -8920 -820 -8921 0
-8918  8919 -8920 -820 -8922 0
-8918  8919 -8920 -820 -8923 0

c  0+1 --> 1
c    (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧  p_820) -> (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0)
c  in CNF:
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_2
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_1
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨  b^{5, 165}_0
c  in DIMACS:
 8918  8919  8920 -820 -8921 0
 8918  8919  8920 -820 -8922 0
 8918  8919  8920 -820  8923 0

c  1+1 --> 2
c    (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0 ∧  p_820) -> (-b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0)
c  in CNF:
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_2
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨  b^{5, 165}_1
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ -p_820 ∨ -b^{5, 165}_0
c  in DIMACS:
 8918  8919 -8920 -820 -8921 0
 8918  8919 -8920 -820  8922 0
 8918  8919 -8920 -820 -8923 0

c  2+1 --> break 
c    (-b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧  p_820) -> break
c  in CNF:
c     b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 8918 -8919  8920 -820 1162 0


c  2-1 --> 1
c    (-b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧ -p_820) -> (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0)
c  in CNF:
c     b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_2
c     b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_1
c     b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨  b^{5, 165}_0
c  in DIMACS:
 8918 -8919  8920  820 -8921 0
 8918 -8919  8920  820 -8922 0
 8918 -8919  8920  820  8923 0

c  1-1 --> 0
c    (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0 ∧ -p_820) -> (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧ -b^{5, 165}_0)
c  in CNF:
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_2
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_1
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_0
c  in DIMACS:
 8918  8919 -8920  820 -8921 0
 8918  8919 -8920  820 -8922 0
 8918  8919 -8920  820 -8923 0

c  0-1 --> -1
c    (-b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧ -p_820) -> ( b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0)
c  in CNF:
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨  b^{5, 165}_2
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_1
c     b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨  b^{5, 165}_0
c  in DIMACS:
 8918  8919  8920  820  8921 0
 8918  8919  8920  820 -8922 0
 8918  8919  8920  820  8923 0

c  -1-1 --> -2
c    ( b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧  b^{5, 164}_0 ∧ -p_820) -> ( b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0)
c  in CNF:
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨  b^{5, 165}_2
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨  b^{5, 165}_1
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨  p_820 ∨ -b^{5, 165}_0
c  in DIMACS:
-8918  8919 -8920  820  8921 0
-8918  8919 -8920  820  8922 0
-8918  8919 -8920  820 -8923 0

c  -2-1 --> break 
c    ( b^{5, 164}_2 ∧  b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨  b^{5, 164}_0 ∨  p_820 ∨ break
c  in DIMACS:
-8918 -8919  8920  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 164}_2 ∧ -b^{5, 164}_1 ∧ -b^{5, 164}_0 ∧ true) 
c  in CNF:
c    -b^{5, 164}_2 ∨  b^{5, 164}_1 ∨  b^{5, 164}_0 ∨ false 
c  in DIMACS:
-8918  8919  8920  0

c  3 does not represent an automaton state.
c    -(-b^{5, 164}_2 ∧  b^{5, 164}_1 ∧  b^{5, 164}_0 ∧ true) 
c  in CNF:
c     b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ false 
c  in DIMACS:
 8918 -8919 -8920  0
c  -3 does not represent an automaton state.
c    -( b^{5, 164}_2 ∧  b^{5, 164}_1 ∧  b^{5, 164}_0 ∧ true) 
c  in CNF:
c    -b^{5, 164}_2 ∨ -b^{5, 164}_1 ∨ -b^{5, 164}_0 ∨ false 
c  in DIMACS:
-8918 -8919 -8920  0

c i = 165
c  -2+1 --> -1
c    ( b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧  p_825) -> ( b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0)
c  in CNF:
c    -b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨  b^{5, 166}_2
c    -b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_1
c    -b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨  b^{5, 166}_0
c  in DIMACS:
-8921 -8922  8923 -825  8924 0
-8921 -8922  8923 -825 -8925 0
-8921 -8922  8923 -825  8926 0

c  -1+1 --> 0
c    ( b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0 ∧  p_825) -> (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧ -b^{5, 166}_0)
c  in CNF:
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_2
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_1
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_0
c  in DIMACS:
-8921  8922 -8923 -825 -8924 0
-8921  8922 -8923 -825 -8925 0
-8921  8922 -8923 -825 -8926 0

c  0+1 --> 1
c    (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧  p_825) -> (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0)
c  in CNF:
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_2
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_1
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨  b^{5, 166}_0
c  in DIMACS:
 8921  8922  8923 -825 -8924 0
 8921  8922  8923 -825 -8925 0
 8921  8922  8923 -825  8926 0

c  1+1 --> 2
c    (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0 ∧  p_825) -> (-b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0)
c  in CNF:
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_2
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨  b^{5, 166}_1
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ -p_825 ∨ -b^{5, 166}_0
c  in DIMACS:
 8921  8922 -8923 -825 -8924 0
 8921  8922 -8923 -825  8925 0
 8921  8922 -8923 -825 -8926 0

c  2+1 --> break 
c    (-b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧  p_825) -> break
c  in CNF:
c     b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 8921 -8922  8923 -825 1162 0


c  2-1 --> 1
c    (-b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧ -p_825) -> (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0)
c  in CNF:
c     b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_2
c     b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_1
c     b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨  b^{5, 166}_0
c  in DIMACS:
 8921 -8922  8923  825 -8924 0
 8921 -8922  8923  825 -8925 0
 8921 -8922  8923  825  8926 0

c  1-1 --> 0
c    (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0 ∧ -p_825) -> (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧ -b^{5, 166}_0)
c  in CNF:
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_2
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_1
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_0
c  in DIMACS:
 8921  8922 -8923  825 -8924 0
 8921  8922 -8923  825 -8925 0
 8921  8922 -8923  825 -8926 0

c  0-1 --> -1
c    (-b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧ -p_825) -> ( b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0)
c  in CNF:
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨  b^{5, 166}_2
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_1
c     b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨  b^{5, 166}_0
c  in DIMACS:
 8921  8922  8923  825  8924 0
 8921  8922  8923  825 -8925 0
 8921  8922  8923  825  8926 0

c  -1-1 --> -2
c    ( b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧  b^{5, 165}_0 ∧ -p_825) -> ( b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0)
c  in CNF:
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨  b^{5, 166}_2
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨  b^{5, 166}_1
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨  p_825 ∨ -b^{5, 166}_0
c  in DIMACS:
-8921  8922 -8923  825  8924 0
-8921  8922 -8923  825  8925 0
-8921  8922 -8923  825 -8926 0

c  -2-1 --> break 
c    ( b^{5, 165}_2 ∧  b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨  b^{5, 165}_0 ∨  p_825 ∨ break
c  in DIMACS:
-8921 -8922  8923  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 165}_2 ∧ -b^{5, 165}_1 ∧ -b^{5, 165}_0 ∧ true) 
c  in CNF:
c    -b^{5, 165}_2 ∨  b^{5, 165}_1 ∨  b^{5, 165}_0 ∨ false 
c  in DIMACS:
-8921  8922  8923  0

c  3 does not represent an automaton state.
c    -(-b^{5, 165}_2 ∧  b^{5, 165}_1 ∧  b^{5, 165}_0 ∧ true) 
c  in CNF:
c     b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ false 
c  in DIMACS:
 8921 -8922 -8923  0
c  -3 does not represent an automaton state.
c    -( b^{5, 165}_2 ∧  b^{5, 165}_1 ∧  b^{5, 165}_0 ∧ true) 
c  in CNF:
c    -b^{5, 165}_2 ∨ -b^{5, 165}_1 ∨ -b^{5, 165}_0 ∨ false 
c  in DIMACS:
-8921 -8922 -8923  0

c i = 166
c  -2+1 --> -1
c    ( b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧  p_830) -> ( b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0)
c  in CNF:
c    -b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨  b^{5, 167}_2
c    -b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_1
c    -b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨  b^{5, 167}_0
c  in DIMACS:
-8924 -8925  8926 -830  8927 0
-8924 -8925  8926 -830 -8928 0
-8924 -8925  8926 -830  8929 0

c  -1+1 --> 0
c    ( b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0 ∧  p_830) -> (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧ -b^{5, 167}_0)
c  in CNF:
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_2
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_1
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_0
c  in DIMACS:
-8924  8925 -8926 -830 -8927 0
-8924  8925 -8926 -830 -8928 0
-8924  8925 -8926 -830 -8929 0

c  0+1 --> 1
c    (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧  p_830) -> (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0)
c  in CNF:
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_2
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_1
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨  b^{5, 167}_0
c  in DIMACS:
 8924  8925  8926 -830 -8927 0
 8924  8925  8926 -830 -8928 0
 8924  8925  8926 -830  8929 0

c  1+1 --> 2
c    (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0 ∧  p_830) -> (-b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0)
c  in CNF:
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_2
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨  b^{5, 167}_1
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ -p_830 ∨ -b^{5, 167}_0
c  in DIMACS:
 8924  8925 -8926 -830 -8927 0
 8924  8925 -8926 -830  8928 0
 8924  8925 -8926 -830 -8929 0

c  2+1 --> break 
c    (-b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧  p_830) -> break
c  in CNF:
c     b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 8924 -8925  8926 -830 1162 0


c  2-1 --> 1
c    (-b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧ -p_830) -> (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0)
c  in CNF:
c     b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_2
c     b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_1
c     b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨  b^{5, 167}_0
c  in DIMACS:
 8924 -8925  8926  830 -8927 0
 8924 -8925  8926  830 -8928 0
 8924 -8925  8926  830  8929 0

c  1-1 --> 0
c    (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0 ∧ -p_830) -> (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧ -b^{5, 167}_0)
c  in CNF:
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_2
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_1
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_0
c  in DIMACS:
 8924  8925 -8926  830 -8927 0
 8924  8925 -8926  830 -8928 0
 8924  8925 -8926  830 -8929 0

c  0-1 --> -1
c    (-b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧ -p_830) -> ( b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0)
c  in CNF:
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨  b^{5, 167}_2
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_1
c     b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨  b^{5, 167}_0
c  in DIMACS:
 8924  8925  8926  830  8927 0
 8924  8925  8926  830 -8928 0
 8924  8925  8926  830  8929 0

c  -1-1 --> -2
c    ( b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧  b^{5, 166}_0 ∧ -p_830) -> ( b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0)
c  in CNF:
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨  b^{5, 167}_2
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨  b^{5, 167}_1
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨  p_830 ∨ -b^{5, 167}_0
c  in DIMACS:
-8924  8925 -8926  830  8927 0
-8924  8925 -8926  830  8928 0
-8924  8925 -8926  830 -8929 0

c  -2-1 --> break 
c    ( b^{5, 166}_2 ∧  b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨  b^{5, 166}_0 ∨  p_830 ∨ break
c  in DIMACS:
-8924 -8925  8926  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 166}_2 ∧ -b^{5, 166}_1 ∧ -b^{5, 166}_0 ∧ true) 
c  in CNF:
c    -b^{5, 166}_2 ∨  b^{5, 166}_1 ∨  b^{5, 166}_0 ∨ false 
c  in DIMACS:
-8924  8925  8926  0

c  3 does not represent an automaton state.
c    -(-b^{5, 166}_2 ∧  b^{5, 166}_1 ∧  b^{5, 166}_0 ∧ true) 
c  in CNF:
c     b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ false 
c  in DIMACS:
 8924 -8925 -8926  0
c  -3 does not represent an automaton state.
c    -( b^{5, 166}_2 ∧  b^{5, 166}_1 ∧  b^{5, 166}_0 ∧ true) 
c  in CNF:
c    -b^{5, 166}_2 ∨ -b^{5, 166}_1 ∨ -b^{5, 166}_0 ∨ false 
c  in DIMACS:
-8924 -8925 -8926  0

c i = 167
c  -2+1 --> -1
c    ( b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧  p_835) -> ( b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0)
c  in CNF:
c    -b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨  b^{5, 168}_2
c    -b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_1
c    -b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨  b^{5, 168}_0
c  in DIMACS:
-8927 -8928  8929 -835  8930 0
-8927 -8928  8929 -835 -8931 0
-8927 -8928  8929 -835  8932 0

c  -1+1 --> 0
c    ( b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0 ∧  p_835) -> (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧ -b^{5, 168}_0)
c  in CNF:
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_2
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_1
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_0
c  in DIMACS:
-8927  8928 -8929 -835 -8930 0
-8927  8928 -8929 -835 -8931 0
-8927  8928 -8929 -835 -8932 0

c  0+1 --> 1
c    (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧  p_835) -> (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0)
c  in CNF:
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_2
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_1
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨  b^{5, 168}_0
c  in DIMACS:
 8927  8928  8929 -835 -8930 0
 8927  8928  8929 -835 -8931 0
 8927  8928  8929 -835  8932 0

c  1+1 --> 2
c    (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0 ∧  p_835) -> (-b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0)
c  in CNF:
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_2
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨  b^{5, 168}_1
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ -p_835 ∨ -b^{5, 168}_0
c  in DIMACS:
 8927  8928 -8929 -835 -8930 0
 8927  8928 -8929 -835  8931 0
 8927  8928 -8929 -835 -8932 0

c  2+1 --> break 
c    (-b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧  p_835) -> break
c  in CNF:
c     b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ -p_835 ∨ break
c  in DIMACS:
 8927 -8928  8929 -835 1162 0


c  2-1 --> 1
c    (-b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧ -p_835) -> (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0)
c  in CNF:
c     b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_2
c     b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_1
c     b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨  b^{5, 168}_0
c  in DIMACS:
 8927 -8928  8929  835 -8930 0
 8927 -8928  8929  835 -8931 0
 8927 -8928  8929  835  8932 0

c  1-1 --> 0
c    (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0 ∧ -p_835) -> (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧ -b^{5, 168}_0)
c  in CNF:
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_2
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_1
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_0
c  in DIMACS:
 8927  8928 -8929  835 -8930 0
 8927  8928 -8929  835 -8931 0
 8927  8928 -8929  835 -8932 0

c  0-1 --> -1
c    (-b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧ -p_835) -> ( b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0)
c  in CNF:
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨  b^{5, 168}_2
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_1
c     b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨  b^{5, 168}_0
c  in DIMACS:
 8927  8928  8929  835  8930 0
 8927  8928  8929  835 -8931 0
 8927  8928  8929  835  8932 0

c  -1-1 --> -2
c    ( b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧  b^{5, 167}_0 ∧ -p_835) -> ( b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0)
c  in CNF:
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨  b^{5, 168}_2
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨  b^{5, 168}_1
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨  p_835 ∨ -b^{5, 168}_0
c  in DIMACS:
-8927  8928 -8929  835  8930 0
-8927  8928 -8929  835  8931 0
-8927  8928 -8929  835 -8932 0

c  -2-1 --> break 
c    ( b^{5, 167}_2 ∧  b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧ -p_835) -> break
c  in CNF:
c    -b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨  b^{5, 167}_0 ∨  p_835 ∨ break
c  in DIMACS:
-8927 -8928  8929  835 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 167}_2 ∧ -b^{5, 167}_1 ∧ -b^{5, 167}_0 ∧ true) 
c  in CNF:
c    -b^{5, 167}_2 ∨  b^{5, 167}_1 ∨  b^{5, 167}_0 ∨ false 
c  in DIMACS:
-8927  8928  8929  0

c  3 does not represent an automaton state.
c    -(-b^{5, 167}_2 ∧  b^{5, 167}_1 ∧  b^{5, 167}_0 ∧ true) 
c  in CNF:
c     b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ false 
c  in DIMACS:
 8927 -8928 -8929  0
c  -3 does not represent an automaton state.
c    -( b^{5, 167}_2 ∧  b^{5, 167}_1 ∧  b^{5, 167}_0 ∧ true) 
c  in CNF:
c    -b^{5, 167}_2 ∨ -b^{5, 167}_1 ∨ -b^{5, 167}_0 ∨ false 
c  in DIMACS:
-8927 -8928 -8929  0

c i = 168
c  -2+1 --> -1
c    ( b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧  p_840) -> ( b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0)
c  in CNF:
c    -b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨  b^{5, 169}_2
c    -b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_1
c    -b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨  b^{5, 169}_0
c  in DIMACS:
-8930 -8931  8932 -840  8933 0
-8930 -8931  8932 -840 -8934 0
-8930 -8931  8932 -840  8935 0

c  -1+1 --> 0
c    ( b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0 ∧  p_840) -> (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧ -b^{5, 169}_0)
c  in CNF:
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_2
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_1
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_0
c  in DIMACS:
-8930  8931 -8932 -840 -8933 0
-8930  8931 -8932 -840 -8934 0
-8930  8931 -8932 -840 -8935 0

c  0+1 --> 1
c    (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧  p_840) -> (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0)
c  in CNF:
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_2
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_1
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨  b^{5, 169}_0
c  in DIMACS:
 8930  8931  8932 -840 -8933 0
 8930  8931  8932 -840 -8934 0
 8930  8931  8932 -840  8935 0

c  1+1 --> 2
c    (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0 ∧  p_840) -> (-b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0)
c  in CNF:
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_2
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨  b^{5, 169}_1
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ -p_840 ∨ -b^{5, 169}_0
c  in DIMACS:
 8930  8931 -8932 -840 -8933 0
 8930  8931 -8932 -840  8934 0
 8930  8931 -8932 -840 -8935 0

c  2+1 --> break 
c    (-b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧  p_840) -> break
c  in CNF:
c     b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 8930 -8931  8932 -840 1162 0


c  2-1 --> 1
c    (-b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧ -p_840) -> (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0)
c  in CNF:
c     b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_2
c     b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_1
c     b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨  b^{5, 169}_0
c  in DIMACS:
 8930 -8931  8932  840 -8933 0
 8930 -8931  8932  840 -8934 0
 8930 -8931  8932  840  8935 0

c  1-1 --> 0
c    (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0 ∧ -p_840) -> (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧ -b^{5, 169}_0)
c  in CNF:
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_2
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_1
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_0
c  in DIMACS:
 8930  8931 -8932  840 -8933 0
 8930  8931 -8932  840 -8934 0
 8930  8931 -8932  840 -8935 0

c  0-1 --> -1
c    (-b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧ -p_840) -> ( b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0)
c  in CNF:
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨  b^{5, 169}_2
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_1
c     b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨  b^{5, 169}_0
c  in DIMACS:
 8930  8931  8932  840  8933 0
 8930  8931  8932  840 -8934 0
 8930  8931  8932  840  8935 0

c  -1-1 --> -2
c    ( b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧  b^{5, 168}_0 ∧ -p_840) -> ( b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0)
c  in CNF:
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨  b^{5, 169}_2
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨  b^{5, 169}_1
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨  p_840 ∨ -b^{5, 169}_0
c  in DIMACS:
-8930  8931 -8932  840  8933 0
-8930  8931 -8932  840  8934 0
-8930  8931 -8932  840 -8935 0

c  -2-1 --> break 
c    ( b^{5, 168}_2 ∧  b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨  b^{5, 168}_0 ∨  p_840 ∨ break
c  in DIMACS:
-8930 -8931  8932  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 168}_2 ∧ -b^{5, 168}_1 ∧ -b^{5, 168}_0 ∧ true) 
c  in CNF:
c    -b^{5, 168}_2 ∨  b^{5, 168}_1 ∨  b^{5, 168}_0 ∨ false 
c  in DIMACS:
-8930  8931  8932  0

c  3 does not represent an automaton state.
c    -(-b^{5, 168}_2 ∧  b^{5, 168}_1 ∧  b^{5, 168}_0 ∧ true) 
c  in CNF:
c     b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ false 
c  in DIMACS:
 8930 -8931 -8932  0
c  -3 does not represent an automaton state.
c    -( b^{5, 168}_2 ∧  b^{5, 168}_1 ∧  b^{5, 168}_0 ∧ true) 
c  in CNF:
c    -b^{5, 168}_2 ∨ -b^{5, 168}_1 ∨ -b^{5, 168}_0 ∨ false 
c  in DIMACS:
-8930 -8931 -8932  0

c i = 169
c  -2+1 --> -1
c    ( b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧  p_845) -> ( b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0)
c  in CNF:
c    -b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨  b^{5, 170}_2
c    -b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_1
c    -b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨  b^{5, 170}_0
c  in DIMACS:
-8933 -8934  8935 -845  8936 0
-8933 -8934  8935 -845 -8937 0
-8933 -8934  8935 -845  8938 0

c  -1+1 --> 0
c    ( b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0 ∧  p_845) -> (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧ -b^{5, 170}_0)
c  in CNF:
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_2
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_1
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_0
c  in DIMACS:
-8933  8934 -8935 -845 -8936 0
-8933  8934 -8935 -845 -8937 0
-8933  8934 -8935 -845 -8938 0

c  0+1 --> 1
c    (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧  p_845) -> (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0)
c  in CNF:
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_2
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_1
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨  b^{5, 170}_0
c  in DIMACS:
 8933  8934  8935 -845 -8936 0
 8933  8934  8935 -845 -8937 0
 8933  8934  8935 -845  8938 0

c  1+1 --> 2
c    (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0 ∧  p_845) -> (-b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0)
c  in CNF:
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_2
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨  b^{5, 170}_1
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ -p_845 ∨ -b^{5, 170}_0
c  in DIMACS:
 8933  8934 -8935 -845 -8936 0
 8933  8934 -8935 -845  8937 0
 8933  8934 -8935 -845 -8938 0

c  2+1 --> break 
c    (-b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧  p_845) -> break
c  in CNF:
c     b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ -p_845 ∨ break
c  in DIMACS:
 8933 -8934  8935 -845 1162 0


c  2-1 --> 1
c    (-b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧ -p_845) -> (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0)
c  in CNF:
c     b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_2
c     b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_1
c     b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨  b^{5, 170}_0
c  in DIMACS:
 8933 -8934  8935  845 -8936 0
 8933 -8934  8935  845 -8937 0
 8933 -8934  8935  845  8938 0

c  1-1 --> 0
c    (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0 ∧ -p_845) -> (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧ -b^{5, 170}_0)
c  in CNF:
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_2
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_1
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_0
c  in DIMACS:
 8933  8934 -8935  845 -8936 0
 8933  8934 -8935  845 -8937 0
 8933  8934 -8935  845 -8938 0

c  0-1 --> -1
c    (-b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧ -p_845) -> ( b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0)
c  in CNF:
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨  b^{5, 170}_2
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_1
c     b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨  b^{5, 170}_0
c  in DIMACS:
 8933  8934  8935  845  8936 0
 8933  8934  8935  845 -8937 0
 8933  8934  8935  845  8938 0

c  -1-1 --> -2
c    ( b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧  b^{5, 169}_0 ∧ -p_845) -> ( b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0)
c  in CNF:
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨  b^{5, 170}_2
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨  b^{5, 170}_1
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨  p_845 ∨ -b^{5, 170}_0
c  in DIMACS:
-8933  8934 -8935  845  8936 0
-8933  8934 -8935  845  8937 0
-8933  8934 -8935  845 -8938 0

c  -2-1 --> break 
c    ( b^{5, 169}_2 ∧  b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧ -p_845) -> break
c  in CNF:
c    -b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨  b^{5, 169}_0 ∨  p_845 ∨ break
c  in DIMACS:
-8933 -8934  8935  845 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 169}_2 ∧ -b^{5, 169}_1 ∧ -b^{5, 169}_0 ∧ true) 
c  in CNF:
c    -b^{5, 169}_2 ∨  b^{5, 169}_1 ∨  b^{5, 169}_0 ∨ false 
c  in DIMACS:
-8933  8934  8935  0

c  3 does not represent an automaton state.
c    -(-b^{5, 169}_2 ∧  b^{5, 169}_1 ∧  b^{5, 169}_0 ∧ true) 
c  in CNF:
c     b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ false 
c  in DIMACS:
 8933 -8934 -8935  0
c  -3 does not represent an automaton state.
c    -( b^{5, 169}_2 ∧  b^{5, 169}_1 ∧  b^{5, 169}_0 ∧ true) 
c  in CNF:
c    -b^{5, 169}_2 ∨ -b^{5, 169}_1 ∨ -b^{5, 169}_0 ∨ false 
c  in DIMACS:
-8933 -8934 -8935  0

c i = 170
c  -2+1 --> -1
c    ( b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧  p_850) -> ( b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0)
c  in CNF:
c    -b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨  b^{5, 171}_2
c    -b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_1
c    -b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨  b^{5, 171}_0
c  in DIMACS:
-8936 -8937  8938 -850  8939 0
-8936 -8937  8938 -850 -8940 0
-8936 -8937  8938 -850  8941 0

c  -1+1 --> 0
c    ( b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0 ∧  p_850) -> (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧ -b^{5, 171}_0)
c  in CNF:
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_2
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_1
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_0
c  in DIMACS:
-8936  8937 -8938 -850 -8939 0
-8936  8937 -8938 -850 -8940 0
-8936  8937 -8938 -850 -8941 0

c  0+1 --> 1
c    (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧  p_850) -> (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0)
c  in CNF:
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_2
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_1
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨  b^{5, 171}_0
c  in DIMACS:
 8936  8937  8938 -850 -8939 0
 8936  8937  8938 -850 -8940 0
 8936  8937  8938 -850  8941 0

c  1+1 --> 2
c    (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0 ∧  p_850) -> (-b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0)
c  in CNF:
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_2
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨  b^{5, 171}_1
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ -p_850 ∨ -b^{5, 171}_0
c  in DIMACS:
 8936  8937 -8938 -850 -8939 0
 8936  8937 -8938 -850  8940 0
 8936  8937 -8938 -850 -8941 0

c  2+1 --> break 
c    (-b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧  p_850) -> break
c  in CNF:
c     b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 8936 -8937  8938 -850 1162 0


c  2-1 --> 1
c    (-b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧ -p_850) -> (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0)
c  in CNF:
c     b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_2
c     b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_1
c     b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨  b^{5, 171}_0
c  in DIMACS:
 8936 -8937  8938  850 -8939 0
 8936 -8937  8938  850 -8940 0
 8936 -8937  8938  850  8941 0

c  1-1 --> 0
c    (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0 ∧ -p_850) -> (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧ -b^{5, 171}_0)
c  in CNF:
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_2
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_1
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_0
c  in DIMACS:
 8936  8937 -8938  850 -8939 0
 8936  8937 -8938  850 -8940 0
 8936  8937 -8938  850 -8941 0

c  0-1 --> -1
c    (-b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧ -p_850) -> ( b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0)
c  in CNF:
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨  b^{5, 171}_2
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_1
c     b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨  b^{5, 171}_0
c  in DIMACS:
 8936  8937  8938  850  8939 0
 8936  8937  8938  850 -8940 0
 8936  8937  8938  850  8941 0

c  -1-1 --> -2
c    ( b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧  b^{5, 170}_0 ∧ -p_850) -> ( b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0)
c  in CNF:
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨  b^{5, 171}_2
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨  b^{5, 171}_1
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨  p_850 ∨ -b^{5, 171}_0
c  in DIMACS:
-8936  8937 -8938  850  8939 0
-8936  8937 -8938  850  8940 0
-8936  8937 -8938  850 -8941 0

c  -2-1 --> break 
c    ( b^{5, 170}_2 ∧  b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨  b^{5, 170}_0 ∨  p_850 ∨ break
c  in DIMACS:
-8936 -8937  8938  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 170}_2 ∧ -b^{5, 170}_1 ∧ -b^{5, 170}_0 ∧ true) 
c  in CNF:
c    -b^{5, 170}_2 ∨  b^{5, 170}_1 ∨  b^{5, 170}_0 ∨ false 
c  in DIMACS:
-8936  8937  8938  0

c  3 does not represent an automaton state.
c    -(-b^{5, 170}_2 ∧  b^{5, 170}_1 ∧  b^{5, 170}_0 ∧ true) 
c  in CNF:
c     b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ false 
c  in DIMACS:
 8936 -8937 -8938  0
c  -3 does not represent an automaton state.
c    -( b^{5, 170}_2 ∧  b^{5, 170}_1 ∧  b^{5, 170}_0 ∧ true) 
c  in CNF:
c    -b^{5, 170}_2 ∨ -b^{5, 170}_1 ∨ -b^{5, 170}_0 ∨ false 
c  in DIMACS:
-8936 -8937 -8938  0

c i = 171
c  -2+1 --> -1
c    ( b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧  p_855) -> ( b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0)
c  in CNF:
c    -b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨  b^{5, 172}_2
c    -b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_1
c    -b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨  b^{5, 172}_0
c  in DIMACS:
-8939 -8940  8941 -855  8942 0
-8939 -8940  8941 -855 -8943 0
-8939 -8940  8941 -855  8944 0

c  -1+1 --> 0
c    ( b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0 ∧  p_855) -> (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧ -b^{5, 172}_0)
c  in CNF:
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_2
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_1
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_0
c  in DIMACS:
-8939  8940 -8941 -855 -8942 0
-8939  8940 -8941 -855 -8943 0
-8939  8940 -8941 -855 -8944 0

c  0+1 --> 1
c    (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧  p_855) -> (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0)
c  in CNF:
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_2
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_1
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨  b^{5, 172}_0
c  in DIMACS:
 8939  8940  8941 -855 -8942 0
 8939  8940  8941 -855 -8943 0
 8939  8940  8941 -855  8944 0

c  1+1 --> 2
c    (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0 ∧  p_855) -> (-b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0)
c  in CNF:
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_2
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨  b^{5, 172}_1
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ -p_855 ∨ -b^{5, 172}_0
c  in DIMACS:
 8939  8940 -8941 -855 -8942 0
 8939  8940 -8941 -855  8943 0
 8939  8940 -8941 -855 -8944 0

c  2+1 --> break 
c    (-b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧  p_855) -> break
c  in CNF:
c     b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 8939 -8940  8941 -855 1162 0


c  2-1 --> 1
c    (-b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧ -p_855) -> (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0)
c  in CNF:
c     b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_2
c     b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_1
c     b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨  b^{5, 172}_0
c  in DIMACS:
 8939 -8940  8941  855 -8942 0
 8939 -8940  8941  855 -8943 0
 8939 -8940  8941  855  8944 0

c  1-1 --> 0
c    (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0 ∧ -p_855) -> (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧ -b^{5, 172}_0)
c  in CNF:
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_2
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_1
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_0
c  in DIMACS:
 8939  8940 -8941  855 -8942 0
 8939  8940 -8941  855 -8943 0
 8939  8940 -8941  855 -8944 0

c  0-1 --> -1
c    (-b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧ -p_855) -> ( b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0)
c  in CNF:
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨  b^{5, 172}_2
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_1
c     b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨  b^{5, 172}_0
c  in DIMACS:
 8939  8940  8941  855  8942 0
 8939  8940  8941  855 -8943 0
 8939  8940  8941  855  8944 0

c  -1-1 --> -2
c    ( b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧  b^{5, 171}_0 ∧ -p_855) -> ( b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0)
c  in CNF:
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨  b^{5, 172}_2
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨  b^{5, 172}_1
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨  p_855 ∨ -b^{5, 172}_0
c  in DIMACS:
-8939  8940 -8941  855  8942 0
-8939  8940 -8941  855  8943 0
-8939  8940 -8941  855 -8944 0

c  -2-1 --> break 
c    ( b^{5, 171}_2 ∧  b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨  b^{5, 171}_0 ∨  p_855 ∨ break
c  in DIMACS:
-8939 -8940  8941  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 171}_2 ∧ -b^{5, 171}_1 ∧ -b^{5, 171}_0 ∧ true) 
c  in CNF:
c    -b^{5, 171}_2 ∨  b^{5, 171}_1 ∨  b^{5, 171}_0 ∨ false 
c  in DIMACS:
-8939  8940  8941  0

c  3 does not represent an automaton state.
c    -(-b^{5, 171}_2 ∧  b^{5, 171}_1 ∧  b^{5, 171}_0 ∧ true) 
c  in CNF:
c     b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ false 
c  in DIMACS:
 8939 -8940 -8941  0
c  -3 does not represent an automaton state.
c    -( b^{5, 171}_2 ∧  b^{5, 171}_1 ∧  b^{5, 171}_0 ∧ true) 
c  in CNF:
c    -b^{5, 171}_2 ∨ -b^{5, 171}_1 ∨ -b^{5, 171}_0 ∨ false 
c  in DIMACS:
-8939 -8940 -8941  0

c i = 172
c  -2+1 --> -1
c    ( b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧  p_860) -> ( b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0)
c  in CNF:
c    -b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨  b^{5, 173}_2
c    -b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_1
c    -b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨  b^{5, 173}_0
c  in DIMACS:
-8942 -8943  8944 -860  8945 0
-8942 -8943  8944 -860 -8946 0
-8942 -8943  8944 -860  8947 0

c  -1+1 --> 0
c    ( b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0 ∧  p_860) -> (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧ -b^{5, 173}_0)
c  in CNF:
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_2
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_1
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_0
c  in DIMACS:
-8942  8943 -8944 -860 -8945 0
-8942  8943 -8944 -860 -8946 0
-8942  8943 -8944 -860 -8947 0

c  0+1 --> 1
c    (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧  p_860) -> (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0)
c  in CNF:
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_2
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_1
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨  b^{5, 173}_0
c  in DIMACS:
 8942  8943  8944 -860 -8945 0
 8942  8943  8944 -860 -8946 0
 8942  8943  8944 -860  8947 0

c  1+1 --> 2
c    (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0 ∧  p_860) -> (-b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0)
c  in CNF:
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_2
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨  b^{5, 173}_1
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ -p_860 ∨ -b^{5, 173}_0
c  in DIMACS:
 8942  8943 -8944 -860 -8945 0
 8942  8943 -8944 -860  8946 0
 8942  8943 -8944 -860 -8947 0

c  2+1 --> break 
c    (-b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧  p_860) -> break
c  in CNF:
c     b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 8942 -8943  8944 -860 1162 0


c  2-1 --> 1
c    (-b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧ -p_860) -> (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0)
c  in CNF:
c     b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_2
c     b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_1
c     b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨  b^{5, 173}_0
c  in DIMACS:
 8942 -8943  8944  860 -8945 0
 8942 -8943  8944  860 -8946 0
 8942 -8943  8944  860  8947 0

c  1-1 --> 0
c    (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0 ∧ -p_860) -> (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧ -b^{5, 173}_0)
c  in CNF:
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_2
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_1
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_0
c  in DIMACS:
 8942  8943 -8944  860 -8945 0
 8942  8943 -8944  860 -8946 0
 8942  8943 -8944  860 -8947 0

c  0-1 --> -1
c    (-b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧ -p_860) -> ( b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0)
c  in CNF:
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨  b^{5, 173}_2
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_1
c     b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨  b^{5, 173}_0
c  in DIMACS:
 8942  8943  8944  860  8945 0
 8942  8943  8944  860 -8946 0
 8942  8943  8944  860  8947 0

c  -1-1 --> -2
c    ( b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧  b^{5, 172}_0 ∧ -p_860) -> ( b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0)
c  in CNF:
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨  b^{5, 173}_2
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨  b^{5, 173}_1
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨  p_860 ∨ -b^{5, 173}_0
c  in DIMACS:
-8942  8943 -8944  860  8945 0
-8942  8943 -8944  860  8946 0
-8942  8943 -8944  860 -8947 0

c  -2-1 --> break 
c    ( b^{5, 172}_2 ∧  b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨  b^{5, 172}_0 ∨  p_860 ∨ break
c  in DIMACS:
-8942 -8943  8944  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 172}_2 ∧ -b^{5, 172}_1 ∧ -b^{5, 172}_0 ∧ true) 
c  in CNF:
c    -b^{5, 172}_2 ∨  b^{5, 172}_1 ∨  b^{5, 172}_0 ∨ false 
c  in DIMACS:
-8942  8943  8944  0

c  3 does not represent an automaton state.
c    -(-b^{5, 172}_2 ∧  b^{5, 172}_1 ∧  b^{5, 172}_0 ∧ true) 
c  in CNF:
c     b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ false 
c  in DIMACS:
 8942 -8943 -8944  0
c  -3 does not represent an automaton state.
c    -( b^{5, 172}_2 ∧  b^{5, 172}_1 ∧  b^{5, 172}_0 ∧ true) 
c  in CNF:
c    -b^{5, 172}_2 ∨ -b^{5, 172}_1 ∨ -b^{5, 172}_0 ∨ false 
c  in DIMACS:
-8942 -8943 -8944  0

c i = 173
c  -2+1 --> -1
c    ( b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧  p_865) -> ( b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0)
c  in CNF:
c    -b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨  b^{5, 174}_2
c    -b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_1
c    -b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨  b^{5, 174}_0
c  in DIMACS:
-8945 -8946  8947 -865  8948 0
-8945 -8946  8947 -865 -8949 0
-8945 -8946  8947 -865  8950 0

c  -1+1 --> 0
c    ( b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0 ∧  p_865) -> (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧ -b^{5, 174}_0)
c  in CNF:
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_2
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_1
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_0
c  in DIMACS:
-8945  8946 -8947 -865 -8948 0
-8945  8946 -8947 -865 -8949 0
-8945  8946 -8947 -865 -8950 0

c  0+1 --> 1
c    (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧  p_865) -> (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0)
c  in CNF:
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_2
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_1
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨  b^{5, 174}_0
c  in DIMACS:
 8945  8946  8947 -865 -8948 0
 8945  8946  8947 -865 -8949 0
 8945  8946  8947 -865  8950 0

c  1+1 --> 2
c    (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0 ∧  p_865) -> (-b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0)
c  in CNF:
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_2
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨  b^{5, 174}_1
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ -p_865 ∨ -b^{5, 174}_0
c  in DIMACS:
 8945  8946 -8947 -865 -8948 0
 8945  8946 -8947 -865  8949 0
 8945  8946 -8947 -865 -8950 0

c  2+1 --> break 
c    (-b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧  p_865) -> break
c  in CNF:
c     b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ -p_865 ∨ break
c  in DIMACS:
 8945 -8946  8947 -865 1162 0


c  2-1 --> 1
c    (-b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧ -p_865) -> (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0)
c  in CNF:
c     b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_2
c     b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_1
c     b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨  b^{5, 174}_0
c  in DIMACS:
 8945 -8946  8947  865 -8948 0
 8945 -8946  8947  865 -8949 0
 8945 -8946  8947  865  8950 0

c  1-1 --> 0
c    (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0 ∧ -p_865) -> (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧ -b^{5, 174}_0)
c  in CNF:
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_2
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_1
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_0
c  in DIMACS:
 8945  8946 -8947  865 -8948 0
 8945  8946 -8947  865 -8949 0
 8945  8946 -8947  865 -8950 0

c  0-1 --> -1
c    (-b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧ -p_865) -> ( b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0)
c  in CNF:
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨  b^{5, 174}_2
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_1
c     b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨  b^{5, 174}_0
c  in DIMACS:
 8945  8946  8947  865  8948 0
 8945  8946  8947  865 -8949 0
 8945  8946  8947  865  8950 0

c  -1-1 --> -2
c    ( b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧  b^{5, 173}_0 ∧ -p_865) -> ( b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0)
c  in CNF:
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨  b^{5, 174}_2
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨  b^{5, 174}_1
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨  p_865 ∨ -b^{5, 174}_0
c  in DIMACS:
-8945  8946 -8947  865  8948 0
-8945  8946 -8947  865  8949 0
-8945  8946 -8947  865 -8950 0

c  -2-1 --> break 
c    ( b^{5, 173}_2 ∧  b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧ -p_865) -> break
c  in CNF:
c    -b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨  b^{5, 173}_0 ∨  p_865 ∨ break
c  in DIMACS:
-8945 -8946  8947  865 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 173}_2 ∧ -b^{5, 173}_1 ∧ -b^{5, 173}_0 ∧ true) 
c  in CNF:
c    -b^{5, 173}_2 ∨  b^{5, 173}_1 ∨  b^{5, 173}_0 ∨ false 
c  in DIMACS:
-8945  8946  8947  0

c  3 does not represent an automaton state.
c    -(-b^{5, 173}_2 ∧  b^{5, 173}_1 ∧  b^{5, 173}_0 ∧ true) 
c  in CNF:
c     b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ false 
c  in DIMACS:
 8945 -8946 -8947  0
c  -3 does not represent an automaton state.
c    -( b^{5, 173}_2 ∧  b^{5, 173}_1 ∧  b^{5, 173}_0 ∧ true) 
c  in CNF:
c    -b^{5, 173}_2 ∨ -b^{5, 173}_1 ∨ -b^{5, 173}_0 ∨ false 
c  in DIMACS:
-8945 -8946 -8947  0

c i = 174
c  -2+1 --> -1
c    ( b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧  p_870) -> ( b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0)
c  in CNF:
c    -b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨  b^{5, 175}_2
c    -b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_1
c    -b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨  b^{5, 175}_0
c  in DIMACS:
-8948 -8949  8950 -870  8951 0
-8948 -8949  8950 -870 -8952 0
-8948 -8949  8950 -870  8953 0

c  -1+1 --> 0
c    ( b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0 ∧  p_870) -> (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧ -b^{5, 175}_0)
c  in CNF:
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_2
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_1
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_0
c  in DIMACS:
-8948  8949 -8950 -870 -8951 0
-8948  8949 -8950 -870 -8952 0
-8948  8949 -8950 -870 -8953 0

c  0+1 --> 1
c    (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧  p_870) -> (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0)
c  in CNF:
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_2
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_1
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨  b^{5, 175}_0
c  in DIMACS:
 8948  8949  8950 -870 -8951 0
 8948  8949  8950 -870 -8952 0
 8948  8949  8950 -870  8953 0

c  1+1 --> 2
c    (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0 ∧  p_870) -> (-b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0)
c  in CNF:
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_2
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨  b^{5, 175}_1
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ -p_870 ∨ -b^{5, 175}_0
c  in DIMACS:
 8948  8949 -8950 -870 -8951 0
 8948  8949 -8950 -870  8952 0
 8948  8949 -8950 -870 -8953 0

c  2+1 --> break 
c    (-b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧  p_870) -> break
c  in CNF:
c     b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 8948 -8949  8950 -870 1162 0


c  2-1 --> 1
c    (-b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧ -p_870) -> (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0)
c  in CNF:
c     b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_2
c     b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_1
c     b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨  b^{5, 175}_0
c  in DIMACS:
 8948 -8949  8950  870 -8951 0
 8948 -8949  8950  870 -8952 0
 8948 -8949  8950  870  8953 0

c  1-1 --> 0
c    (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0 ∧ -p_870) -> (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧ -b^{5, 175}_0)
c  in CNF:
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_2
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_1
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_0
c  in DIMACS:
 8948  8949 -8950  870 -8951 0
 8948  8949 -8950  870 -8952 0
 8948  8949 -8950  870 -8953 0

c  0-1 --> -1
c    (-b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧ -p_870) -> ( b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0)
c  in CNF:
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨  b^{5, 175}_2
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_1
c     b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨  b^{5, 175}_0
c  in DIMACS:
 8948  8949  8950  870  8951 0
 8948  8949  8950  870 -8952 0
 8948  8949  8950  870  8953 0

c  -1-1 --> -2
c    ( b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧  b^{5, 174}_0 ∧ -p_870) -> ( b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0)
c  in CNF:
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨  b^{5, 175}_2
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨  b^{5, 175}_1
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨  p_870 ∨ -b^{5, 175}_0
c  in DIMACS:
-8948  8949 -8950  870  8951 0
-8948  8949 -8950  870  8952 0
-8948  8949 -8950  870 -8953 0

c  -2-1 --> break 
c    ( b^{5, 174}_2 ∧  b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨  b^{5, 174}_0 ∨  p_870 ∨ break
c  in DIMACS:
-8948 -8949  8950  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 174}_2 ∧ -b^{5, 174}_1 ∧ -b^{5, 174}_0 ∧ true) 
c  in CNF:
c    -b^{5, 174}_2 ∨  b^{5, 174}_1 ∨  b^{5, 174}_0 ∨ false 
c  in DIMACS:
-8948  8949  8950  0

c  3 does not represent an automaton state.
c    -(-b^{5, 174}_2 ∧  b^{5, 174}_1 ∧  b^{5, 174}_0 ∧ true) 
c  in CNF:
c     b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ false 
c  in DIMACS:
 8948 -8949 -8950  0
c  -3 does not represent an automaton state.
c    -( b^{5, 174}_2 ∧  b^{5, 174}_1 ∧  b^{5, 174}_0 ∧ true) 
c  in CNF:
c    -b^{5, 174}_2 ∨ -b^{5, 174}_1 ∨ -b^{5, 174}_0 ∨ false 
c  in DIMACS:
-8948 -8949 -8950  0

c i = 175
c  -2+1 --> -1
c    ( b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧  p_875) -> ( b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0)
c  in CNF:
c    -b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨  b^{5, 176}_2
c    -b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_1
c    -b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨  b^{5, 176}_0
c  in DIMACS:
-8951 -8952  8953 -875  8954 0
-8951 -8952  8953 -875 -8955 0
-8951 -8952  8953 -875  8956 0

c  -1+1 --> 0
c    ( b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0 ∧  p_875) -> (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧ -b^{5, 176}_0)
c  in CNF:
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_2
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_1
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_0
c  in DIMACS:
-8951  8952 -8953 -875 -8954 0
-8951  8952 -8953 -875 -8955 0
-8951  8952 -8953 -875 -8956 0

c  0+1 --> 1
c    (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧  p_875) -> (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0)
c  in CNF:
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_2
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_1
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨  b^{5, 176}_0
c  in DIMACS:
 8951  8952  8953 -875 -8954 0
 8951  8952  8953 -875 -8955 0
 8951  8952  8953 -875  8956 0

c  1+1 --> 2
c    (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0 ∧  p_875) -> (-b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0)
c  in CNF:
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_2
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨  b^{5, 176}_1
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ -p_875 ∨ -b^{5, 176}_0
c  in DIMACS:
 8951  8952 -8953 -875 -8954 0
 8951  8952 -8953 -875  8955 0
 8951  8952 -8953 -875 -8956 0

c  2+1 --> break 
c    (-b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧  p_875) -> break
c  in CNF:
c     b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 8951 -8952  8953 -875 1162 0


c  2-1 --> 1
c    (-b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧ -p_875) -> (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0)
c  in CNF:
c     b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_2
c     b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_1
c     b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨  b^{5, 176}_0
c  in DIMACS:
 8951 -8952  8953  875 -8954 0
 8951 -8952  8953  875 -8955 0
 8951 -8952  8953  875  8956 0

c  1-1 --> 0
c    (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0 ∧ -p_875) -> (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧ -b^{5, 176}_0)
c  in CNF:
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_2
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_1
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_0
c  in DIMACS:
 8951  8952 -8953  875 -8954 0
 8951  8952 -8953  875 -8955 0
 8951  8952 -8953  875 -8956 0

c  0-1 --> -1
c    (-b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧ -p_875) -> ( b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0)
c  in CNF:
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨  b^{5, 176}_2
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_1
c     b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨  b^{5, 176}_0
c  in DIMACS:
 8951  8952  8953  875  8954 0
 8951  8952  8953  875 -8955 0
 8951  8952  8953  875  8956 0

c  -1-1 --> -2
c    ( b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧  b^{5, 175}_0 ∧ -p_875) -> ( b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0)
c  in CNF:
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨  b^{5, 176}_2
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨  b^{5, 176}_1
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨  p_875 ∨ -b^{5, 176}_0
c  in DIMACS:
-8951  8952 -8953  875  8954 0
-8951  8952 -8953  875  8955 0
-8951  8952 -8953  875 -8956 0

c  -2-1 --> break 
c    ( b^{5, 175}_2 ∧  b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨  b^{5, 175}_0 ∨  p_875 ∨ break
c  in DIMACS:
-8951 -8952  8953  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 175}_2 ∧ -b^{5, 175}_1 ∧ -b^{5, 175}_0 ∧ true) 
c  in CNF:
c    -b^{5, 175}_2 ∨  b^{5, 175}_1 ∨  b^{5, 175}_0 ∨ false 
c  in DIMACS:
-8951  8952  8953  0

c  3 does not represent an automaton state.
c    -(-b^{5, 175}_2 ∧  b^{5, 175}_1 ∧  b^{5, 175}_0 ∧ true) 
c  in CNF:
c     b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ false 
c  in DIMACS:
 8951 -8952 -8953  0
c  -3 does not represent an automaton state.
c    -( b^{5, 175}_2 ∧  b^{5, 175}_1 ∧  b^{5, 175}_0 ∧ true) 
c  in CNF:
c    -b^{5, 175}_2 ∨ -b^{5, 175}_1 ∨ -b^{5, 175}_0 ∨ false 
c  in DIMACS:
-8951 -8952 -8953  0

c i = 176
c  -2+1 --> -1
c    ( b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧  p_880) -> ( b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0)
c  in CNF:
c    -b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨  b^{5, 177}_2
c    -b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_1
c    -b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨  b^{5, 177}_0
c  in DIMACS:
-8954 -8955  8956 -880  8957 0
-8954 -8955  8956 -880 -8958 0
-8954 -8955  8956 -880  8959 0

c  -1+1 --> 0
c    ( b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0 ∧  p_880) -> (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧ -b^{5, 177}_0)
c  in CNF:
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_2
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_1
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_0
c  in DIMACS:
-8954  8955 -8956 -880 -8957 0
-8954  8955 -8956 -880 -8958 0
-8954  8955 -8956 -880 -8959 0

c  0+1 --> 1
c    (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧  p_880) -> (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0)
c  in CNF:
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_2
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_1
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨  b^{5, 177}_0
c  in DIMACS:
 8954  8955  8956 -880 -8957 0
 8954  8955  8956 -880 -8958 0
 8954  8955  8956 -880  8959 0

c  1+1 --> 2
c    (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0 ∧  p_880) -> (-b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0)
c  in CNF:
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_2
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨  b^{5, 177}_1
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ -p_880 ∨ -b^{5, 177}_0
c  in DIMACS:
 8954  8955 -8956 -880 -8957 0
 8954  8955 -8956 -880  8958 0
 8954  8955 -8956 -880 -8959 0

c  2+1 --> break 
c    (-b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧  p_880) -> break
c  in CNF:
c     b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 8954 -8955  8956 -880 1162 0


c  2-1 --> 1
c    (-b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧ -p_880) -> (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0)
c  in CNF:
c     b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_2
c     b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_1
c     b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨  b^{5, 177}_0
c  in DIMACS:
 8954 -8955  8956  880 -8957 0
 8954 -8955  8956  880 -8958 0
 8954 -8955  8956  880  8959 0

c  1-1 --> 0
c    (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0 ∧ -p_880) -> (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧ -b^{5, 177}_0)
c  in CNF:
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_2
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_1
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_0
c  in DIMACS:
 8954  8955 -8956  880 -8957 0
 8954  8955 -8956  880 -8958 0
 8954  8955 -8956  880 -8959 0

c  0-1 --> -1
c    (-b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧ -p_880) -> ( b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0)
c  in CNF:
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨  b^{5, 177}_2
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_1
c     b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨  b^{5, 177}_0
c  in DIMACS:
 8954  8955  8956  880  8957 0
 8954  8955  8956  880 -8958 0
 8954  8955  8956  880  8959 0

c  -1-1 --> -2
c    ( b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧  b^{5, 176}_0 ∧ -p_880) -> ( b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0)
c  in CNF:
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨  b^{5, 177}_2
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨  b^{5, 177}_1
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨  p_880 ∨ -b^{5, 177}_0
c  in DIMACS:
-8954  8955 -8956  880  8957 0
-8954  8955 -8956  880  8958 0
-8954  8955 -8956  880 -8959 0

c  -2-1 --> break 
c    ( b^{5, 176}_2 ∧  b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨  b^{5, 176}_0 ∨  p_880 ∨ break
c  in DIMACS:
-8954 -8955  8956  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 176}_2 ∧ -b^{5, 176}_1 ∧ -b^{5, 176}_0 ∧ true) 
c  in CNF:
c    -b^{5, 176}_2 ∨  b^{5, 176}_1 ∨  b^{5, 176}_0 ∨ false 
c  in DIMACS:
-8954  8955  8956  0

c  3 does not represent an automaton state.
c    -(-b^{5, 176}_2 ∧  b^{5, 176}_1 ∧  b^{5, 176}_0 ∧ true) 
c  in CNF:
c     b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ false 
c  in DIMACS:
 8954 -8955 -8956  0
c  -3 does not represent an automaton state.
c    -( b^{5, 176}_2 ∧  b^{5, 176}_1 ∧  b^{5, 176}_0 ∧ true) 
c  in CNF:
c    -b^{5, 176}_2 ∨ -b^{5, 176}_1 ∨ -b^{5, 176}_0 ∨ false 
c  in DIMACS:
-8954 -8955 -8956  0

c i = 177
c  -2+1 --> -1
c    ( b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧  p_885) -> ( b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0)
c  in CNF:
c    -b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨  b^{5, 178}_2
c    -b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_1
c    -b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨  b^{5, 178}_0
c  in DIMACS:
-8957 -8958  8959 -885  8960 0
-8957 -8958  8959 -885 -8961 0
-8957 -8958  8959 -885  8962 0

c  -1+1 --> 0
c    ( b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0 ∧  p_885) -> (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧ -b^{5, 178}_0)
c  in CNF:
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_2
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_1
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_0
c  in DIMACS:
-8957  8958 -8959 -885 -8960 0
-8957  8958 -8959 -885 -8961 0
-8957  8958 -8959 -885 -8962 0

c  0+1 --> 1
c    (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧  p_885) -> (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0)
c  in CNF:
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_2
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_1
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨  b^{5, 178}_0
c  in DIMACS:
 8957  8958  8959 -885 -8960 0
 8957  8958  8959 -885 -8961 0
 8957  8958  8959 -885  8962 0

c  1+1 --> 2
c    (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0 ∧  p_885) -> (-b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0)
c  in CNF:
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_2
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨  b^{5, 178}_1
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ -p_885 ∨ -b^{5, 178}_0
c  in DIMACS:
 8957  8958 -8959 -885 -8960 0
 8957  8958 -8959 -885  8961 0
 8957  8958 -8959 -885 -8962 0

c  2+1 --> break 
c    (-b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧  p_885) -> break
c  in CNF:
c     b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 8957 -8958  8959 -885 1162 0


c  2-1 --> 1
c    (-b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧ -p_885) -> (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0)
c  in CNF:
c     b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_2
c     b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_1
c     b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨  b^{5, 178}_0
c  in DIMACS:
 8957 -8958  8959  885 -8960 0
 8957 -8958  8959  885 -8961 0
 8957 -8958  8959  885  8962 0

c  1-1 --> 0
c    (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0 ∧ -p_885) -> (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧ -b^{5, 178}_0)
c  in CNF:
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_2
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_1
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_0
c  in DIMACS:
 8957  8958 -8959  885 -8960 0
 8957  8958 -8959  885 -8961 0
 8957  8958 -8959  885 -8962 0

c  0-1 --> -1
c    (-b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧ -p_885) -> ( b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0)
c  in CNF:
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨  b^{5, 178}_2
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_1
c     b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨  b^{5, 178}_0
c  in DIMACS:
 8957  8958  8959  885  8960 0
 8957  8958  8959  885 -8961 0
 8957  8958  8959  885  8962 0

c  -1-1 --> -2
c    ( b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧  b^{5, 177}_0 ∧ -p_885) -> ( b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0)
c  in CNF:
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨  b^{5, 178}_2
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨  b^{5, 178}_1
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨  p_885 ∨ -b^{5, 178}_0
c  in DIMACS:
-8957  8958 -8959  885  8960 0
-8957  8958 -8959  885  8961 0
-8957  8958 -8959  885 -8962 0

c  -2-1 --> break 
c    ( b^{5, 177}_2 ∧  b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨  b^{5, 177}_0 ∨  p_885 ∨ break
c  in DIMACS:
-8957 -8958  8959  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 177}_2 ∧ -b^{5, 177}_1 ∧ -b^{5, 177}_0 ∧ true) 
c  in CNF:
c    -b^{5, 177}_2 ∨  b^{5, 177}_1 ∨  b^{5, 177}_0 ∨ false 
c  in DIMACS:
-8957  8958  8959  0

c  3 does not represent an automaton state.
c    -(-b^{5, 177}_2 ∧  b^{5, 177}_1 ∧  b^{5, 177}_0 ∧ true) 
c  in CNF:
c     b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ false 
c  in DIMACS:
 8957 -8958 -8959  0
c  -3 does not represent an automaton state.
c    -( b^{5, 177}_2 ∧  b^{5, 177}_1 ∧  b^{5, 177}_0 ∧ true) 
c  in CNF:
c    -b^{5, 177}_2 ∨ -b^{5, 177}_1 ∨ -b^{5, 177}_0 ∨ false 
c  in DIMACS:
-8957 -8958 -8959  0

c i = 178
c  -2+1 --> -1
c    ( b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧  p_890) -> ( b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0)
c  in CNF:
c    -b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨  b^{5, 179}_2
c    -b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_1
c    -b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨  b^{5, 179}_0
c  in DIMACS:
-8960 -8961  8962 -890  8963 0
-8960 -8961  8962 -890 -8964 0
-8960 -8961  8962 -890  8965 0

c  -1+1 --> 0
c    ( b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0 ∧  p_890) -> (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧ -b^{5, 179}_0)
c  in CNF:
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_2
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_1
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_0
c  in DIMACS:
-8960  8961 -8962 -890 -8963 0
-8960  8961 -8962 -890 -8964 0
-8960  8961 -8962 -890 -8965 0

c  0+1 --> 1
c    (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧  p_890) -> (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0)
c  in CNF:
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_2
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_1
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨  b^{5, 179}_0
c  in DIMACS:
 8960  8961  8962 -890 -8963 0
 8960  8961  8962 -890 -8964 0
 8960  8961  8962 -890  8965 0

c  1+1 --> 2
c    (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0 ∧  p_890) -> (-b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0)
c  in CNF:
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_2
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨  b^{5, 179}_1
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ -p_890 ∨ -b^{5, 179}_0
c  in DIMACS:
 8960  8961 -8962 -890 -8963 0
 8960  8961 -8962 -890  8964 0
 8960  8961 -8962 -890 -8965 0

c  2+1 --> break 
c    (-b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧  p_890) -> break
c  in CNF:
c     b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 8960 -8961  8962 -890 1162 0


c  2-1 --> 1
c    (-b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧ -p_890) -> (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0)
c  in CNF:
c     b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_2
c     b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_1
c     b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨  b^{5, 179}_0
c  in DIMACS:
 8960 -8961  8962  890 -8963 0
 8960 -8961  8962  890 -8964 0
 8960 -8961  8962  890  8965 0

c  1-1 --> 0
c    (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0 ∧ -p_890) -> (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧ -b^{5, 179}_0)
c  in CNF:
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_2
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_1
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_0
c  in DIMACS:
 8960  8961 -8962  890 -8963 0
 8960  8961 -8962  890 -8964 0
 8960  8961 -8962  890 -8965 0

c  0-1 --> -1
c    (-b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧ -p_890) -> ( b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0)
c  in CNF:
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨  b^{5, 179}_2
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_1
c     b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨  b^{5, 179}_0
c  in DIMACS:
 8960  8961  8962  890  8963 0
 8960  8961  8962  890 -8964 0
 8960  8961  8962  890  8965 0

c  -1-1 --> -2
c    ( b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧  b^{5, 178}_0 ∧ -p_890) -> ( b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0)
c  in CNF:
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨  b^{5, 179}_2
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨  b^{5, 179}_1
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨  p_890 ∨ -b^{5, 179}_0
c  in DIMACS:
-8960  8961 -8962  890  8963 0
-8960  8961 -8962  890  8964 0
-8960  8961 -8962  890 -8965 0

c  -2-1 --> break 
c    ( b^{5, 178}_2 ∧  b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨  b^{5, 178}_0 ∨  p_890 ∨ break
c  in DIMACS:
-8960 -8961  8962  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 178}_2 ∧ -b^{5, 178}_1 ∧ -b^{5, 178}_0 ∧ true) 
c  in CNF:
c    -b^{5, 178}_2 ∨  b^{5, 178}_1 ∨  b^{5, 178}_0 ∨ false 
c  in DIMACS:
-8960  8961  8962  0

c  3 does not represent an automaton state.
c    -(-b^{5, 178}_2 ∧  b^{5, 178}_1 ∧  b^{5, 178}_0 ∧ true) 
c  in CNF:
c     b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ false 
c  in DIMACS:
 8960 -8961 -8962  0
c  -3 does not represent an automaton state.
c    -( b^{5, 178}_2 ∧  b^{5, 178}_1 ∧  b^{5, 178}_0 ∧ true) 
c  in CNF:
c    -b^{5, 178}_2 ∨ -b^{5, 178}_1 ∨ -b^{5, 178}_0 ∨ false 
c  in DIMACS:
-8960 -8961 -8962  0

c i = 179
c  -2+1 --> -1
c    ( b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧  p_895) -> ( b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0)
c  in CNF:
c    -b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨  b^{5, 180}_2
c    -b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_1
c    -b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨  b^{5, 180}_0
c  in DIMACS:
-8963 -8964  8965 -895  8966 0
-8963 -8964  8965 -895 -8967 0
-8963 -8964  8965 -895  8968 0

c  -1+1 --> 0
c    ( b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0 ∧  p_895) -> (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧ -b^{5, 180}_0)
c  in CNF:
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_2
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_1
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_0
c  in DIMACS:
-8963  8964 -8965 -895 -8966 0
-8963  8964 -8965 -895 -8967 0
-8963  8964 -8965 -895 -8968 0

c  0+1 --> 1
c    (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧  p_895) -> (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0)
c  in CNF:
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_2
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_1
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨  b^{5, 180}_0
c  in DIMACS:
 8963  8964  8965 -895 -8966 0
 8963  8964  8965 -895 -8967 0
 8963  8964  8965 -895  8968 0

c  1+1 --> 2
c    (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0 ∧  p_895) -> (-b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0)
c  in CNF:
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_2
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨  b^{5, 180}_1
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ -p_895 ∨ -b^{5, 180}_0
c  in DIMACS:
 8963  8964 -8965 -895 -8966 0
 8963  8964 -8965 -895  8967 0
 8963  8964 -8965 -895 -8968 0

c  2+1 --> break 
c    (-b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧  p_895) -> break
c  in CNF:
c     b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ -p_895 ∨ break
c  in DIMACS:
 8963 -8964  8965 -895 1162 0


c  2-1 --> 1
c    (-b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧ -p_895) -> (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0)
c  in CNF:
c     b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_2
c     b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_1
c     b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨  b^{5, 180}_0
c  in DIMACS:
 8963 -8964  8965  895 -8966 0
 8963 -8964  8965  895 -8967 0
 8963 -8964  8965  895  8968 0

c  1-1 --> 0
c    (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0 ∧ -p_895) -> (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧ -b^{5, 180}_0)
c  in CNF:
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_2
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_1
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_0
c  in DIMACS:
 8963  8964 -8965  895 -8966 0
 8963  8964 -8965  895 -8967 0
 8963  8964 -8965  895 -8968 0

c  0-1 --> -1
c    (-b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧ -p_895) -> ( b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0)
c  in CNF:
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨  b^{5, 180}_2
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_1
c     b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨  b^{5, 180}_0
c  in DIMACS:
 8963  8964  8965  895  8966 0
 8963  8964  8965  895 -8967 0
 8963  8964  8965  895  8968 0

c  -1-1 --> -2
c    ( b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧  b^{5, 179}_0 ∧ -p_895) -> ( b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0)
c  in CNF:
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨  b^{5, 180}_2
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨  b^{5, 180}_1
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨  p_895 ∨ -b^{5, 180}_0
c  in DIMACS:
-8963  8964 -8965  895  8966 0
-8963  8964 -8965  895  8967 0
-8963  8964 -8965  895 -8968 0

c  -2-1 --> break 
c    ( b^{5, 179}_2 ∧  b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧ -p_895) -> break
c  in CNF:
c    -b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨  b^{5, 179}_0 ∨  p_895 ∨ break
c  in DIMACS:
-8963 -8964  8965  895 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 179}_2 ∧ -b^{5, 179}_1 ∧ -b^{5, 179}_0 ∧ true) 
c  in CNF:
c    -b^{5, 179}_2 ∨  b^{5, 179}_1 ∨  b^{5, 179}_0 ∨ false 
c  in DIMACS:
-8963  8964  8965  0

c  3 does not represent an automaton state.
c    -(-b^{5, 179}_2 ∧  b^{5, 179}_1 ∧  b^{5, 179}_0 ∧ true) 
c  in CNF:
c     b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ false 
c  in DIMACS:
 8963 -8964 -8965  0
c  -3 does not represent an automaton state.
c    -( b^{5, 179}_2 ∧  b^{5, 179}_1 ∧  b^{5, 179}_0 ∧ true) 
c  in CNF:
c    -b^{5, 179}_2 ∨ -b^{5, 179}_1 ∨ -b^{5, 179}_0 ∨ false 
c  in DIMACS:
-8963 -8964 -8965  0

c i = 180
c  -2+1 --> -1
c    ( b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧  p_900) -> ( b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0)
c  in CNF:
c    -b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨  b^{5, 181}_2
c    -b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_1
c    -b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨  b^{5, 181}_0
c  in DIMACS:
-8966 -8967  8968 -900  8969 0
-8966 -8967  8968 -900 -8970 0
-8966 -8967  8968 -900  8971 0

c  -1+1 --> 0
c    ( b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0 ∧  p_900) -> (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧ -b^{5, 181}_0)
c  in CNF:
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_2
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_1
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_0
c  in DIMACS:
-8966  8967 -8968 -900 -8969 0
-8966  8967 -8968 -900 -8970 0
-8966  8967 -8968 -900 -8971 0

c  0+1 --> 1
c    (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧  p_900) -> (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0)
c  in CNF:
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_2
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_1
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨  b^{5, 181}_0
c  in DIMACS:
 8966  8967  8968 -900 -8969 0
 8966  8967  8968 -900 -8970 0
 8966  8967  8968 -900  8971 0

c  1+1 --> 2
c    (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0 ∧  p_900) -> (-b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0)
c  in CNF:
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_2
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨  b^{5, 181}_1
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ -p_900 ∨ -b^{5, 181}_0
c  in DIMACS:
 8966  8967 -8968 -900 -8969 0
 8966  8967 -8968 -900  8970 0
 8966  8967 -8968 -900 -8971 0

c  2+1 --> break 
c    (-b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧  p_900) -> break
c  in CNF:
c     b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 8966 -8967  8968 -900 1162 0


c  2-1 --> 1
c    (-b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧ -p_900) -> (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0)
c  in CNF:
c     b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_2
c     b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_1
c     b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨  b^{5, 181}_0
c  in DIMACS:
 8966 -8967  8968  900 -8969 0
 8966 -8967  8968  900 -8970 0
 8966 -8967  8968  900  8971 0

c  1-1 --> 0
c    (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0 ∧ -p_900) -> (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧ -b^{5, 181}_0)
c  in CNF:
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_2
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_1
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_0
c  in DIMACS:
 8966  8967 -8968  900 -8969 0
 8966  8967 -8968  900 -8970 0
 8966  8967 -8968  900 -8971 0

c  0-1 --> -1
c    (-b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧ -p_900) -> ( b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0)
c  in CNF:
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨  b^{5, 181}_2
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_1
c     b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨  b^{5, 181}_0
c  in DIMACS:
 8966  8967  8968  900  8969 0
 8966  8967  8968  900 -8970 0
 8966  8967  8968  900  8971 0

c  -1-1 --> -2
c    ( b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧  b^{5, 180}_0 ∧ -p_900) -> ( b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0)
c  in CNF:
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨  b^{5, 181}_2
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨  b^{5, 181}_1
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨  p_900 ∨ -b^{5, 181}_0
c  in DIMACS:
-8966  8967 -8968  900  8969 0
-8966  8967 -8968  900  8970 0
-8966  8967 -8968  900 -8971 0

c  -2-1 --> break 
c    ( b^{5, 180}_2 ∧  b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨  b^{5, 180}_0 ∨  p_900 ∨ break
c  in DIMACS:
-8966 -8967  8968  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 180}_2 ∧ -b^{5, 180}_1 ∧ -b^{5, 180}_0 ∧ true) 
c  in CNF:
c    -b^{5, 180}_2 ∨  b^{5, 180}_1 ∨  b^{5, 180}_0 ∨ false 
c  in DIMACS:
-8966  8967  8968  0

c  3 does not represent an automaton state.
c    -(-b^{5, 180}_2 ∧  b^{5, 180}_1 ∧  b^{5, 180}_0 ∧ true) 
c  in CNF:
c     b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ false 
c  in DIMACS:
 8966 -8967 -8968  0
c  -3 does not represent an automaton state.
c    -( b^{5, 180}_2 ∧  b^{5, 180}_1 ∧  b^{5, 180}_0 ∧ true) 
c  in CNF:
c    -b^{5, 180}_2 ∨ -b^{5, 180}_1 ∨ -b^{5, 180}_0 ∨ false 
c  in DIMACS:
-8966 -8967 -8968  0

c i = 181
c  -2+1 --> -1
c    ( b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧  p_905) -> ( b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0)
c  in CNF:
c    -b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨  b^{5, 182}_2
c    -b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_1
c    -b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨  b^{5, 182}_0
c  in DIMACS:
-8969 -8970  8971 -905  8972 0
-8969 -8970  8971 -905 -8973 0
-8969 -8970  8971 -905  8974 0

c  -1+1 --> 0
c    ( b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0 ∧  p_905) -> (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧ -b^{5, 182}_0)
c  in CNF:
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_2
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_1
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_0
c  in DIMACS:
-8969  8970 -8971 -905 -8972 0
-8969  8970 -8971 -905 -8973 0
-8969  8970 -8971 -905 -8974 0

c  0+1 --> 1
c    (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧  p_905) -> (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0)
c  in CNF:
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_2
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_1
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨  b^{5, 182}_0
c  in DIMACS:
 8969  8970  8971 -905 -8972 0
 8969  8970  8971 -905 -8973 0
 8969  8970  8971 -905  8974 0

c  1+1 --> 2
c    (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0 ∧  p_905) -> (-b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0)
c  in CNF:
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_2
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨  b^{5, 182}_1
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ -p_905 ∨ -b^{5, 182}_0
c  in DIMACS:
 8969  8970 -8971 -905 -8972 0
 8969  8970 -8971 -905  8973 0
 8969  8970 -8971 -905 -8974 0

c  2+1 --> break 
c    (-b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧  p_905) -> break
c  in CNF:
c     b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ -p_905 ∨ break
c  in DIMACS:
 8969 -8970  8971 -905 1162 0


c  2-1 --> 1
c    (-b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧ -p_905) -> (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0)
c  in CNF:
c     b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_2
c     b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_1
c     b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨  b^{5, 182}_0
c  in DIMACS:
 8969 -8970  8971  905 -8972 0
 8969 -8970  8971  905 -8973 0
 8969 -8970  8971  905  8974 0

c  1-1 --> 0
c    (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0 ∧ -p_905) -> (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧ -b^{5, 182}_0)
c  in CNF:
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_2
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_1
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_0
c  in DIMACS:
 8969  8970 -8971  905 -8972 0
 8969  8970 -8971  905 -8973 0
 8969  8970 -8971  905 -8974 0

c  0-1 --> -1
c    (-b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧ -p_905) -> ( b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0)
c  in CNF:
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨  b^{5, 182}_2
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_1
c     b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨  b^{5, 182}_0
c  in DIMACS:
 8969  8970  8971  905  8972 0
 8969  8970  8971  905 -8973 0
 8969  8970  8971  905  8974 0

c  -1-1 --> -2
c    ( b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧  b^{5, 181}_0 ∧ -p_905) -> ( b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0)
c  in CNF:
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨  b^{5, 182}_2
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨  b^{5, 182}_1
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨  p_905 ∨ -b^{5, 182}_0
c  in DIMACS:
-8969  8970 -8971  905  8972 0
-8969  8970 -8971  905  8973 0
-8969  8970 -8971  905 -8974 0

c  -2-1 --> break 
c    ( b^{5, 181}_2 ∧  b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧ -p_905) -> break
c  in CNF:
c    -b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨  b^{5, 181}_0 ∨  p_905 ∨ break
c  in DIMACS:
-8969 -8970  8971  905 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 181}_2 ∧ -b^{5, 181}_1 ∧ -b^{5, 181}_0 ∧ true) 
c  in CNF:
c    -b^{5, 181}_2 ∨  b^{5, 181}_1 ∨  b^{5, 181}_0 ∨ false 
c  in DIMACS:
-8969  8970  8971  0

c  3 does not represent an automaton state.
c    -(-b^{5, 181}_2 ∧  b^{5, 181}_1 ∧  b^{5, 181}_0 ∧ true) 
c  in CNF:
c     b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ false 
c  in DIMACS:
 8969 -8970 -8971  0
c  -3 does not represent an automaton state.
c    -( b^{5, 181}_2 ∧  b^{5, 181}_1 ∧  b^{5, 181}_0 ∧ true) 
c  in CNF:
c    -b^{5, 181}_2 ∨ -b^{5, 181}_1 ∨ -b^{5, 181}_0 ∨ false 
c  in DIMACS:
-8969 -8970 -8971  0

c i = 182
c  -2+1 --> -1
c    ( b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧  p_910) -> ( b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0)
c  in CNF:
c    -b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨  b^{5, 183}_2
c    -b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_1
c    -b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨  b^{5, 183}_0
c  in DIMACS:
-8972 -8973  8974 -910  8975 0
-8972 -8973  8974 -910 -8976 0
-8972 -8973  8974 -910  8977 0

c  -1+1 --> 0
c    ( b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0 ∧  p_910) -> (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧ -b^{5, 183}_0)
c  in CNF:
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_2
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_1
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_0
c  in DIMACS:
-8972  8973 -8974 -910 -8975 0
-8972  8973 -8974 -910 -8976 0
-8972  8973 -8974 -910 -8977 0

c  0+1 --> 1
c    (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧  p_910) -> (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0)
c  in CNF:
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_2
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_1
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨  b^{5, 183}_0
c  in DIMACS:
 8972  8973  8974 -910 -8975 0
 8972  8973  8974 -910 -8976 0
 8972  8973  8974 -910  8977 0

c  1+1 --> 2
c    (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0 ∧  p_910) -> (-b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0)
c  in CNF:
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_2
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨  b^{5, 183}_1
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ -p_910 ∨ -b^{5, 183}_0
c  in DIMACS:
 8972  8973 -8974 -910 -8975 0
 8972  8973 -8974 -910  8976 0
 8972  8973 -8974 -910 -8977 0

c  2+1 --> break 
c    (-b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧  p_910) -> break
c  in CNF:
c     b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 8972 -8973  8974 -910 1162 0


c  2-1 --> 1
c    (-b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧ -p_910) -> (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0)
c  in CNF:
c     b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_2
c     b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_1
c     b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨  b^{5, 183}_0
c  in DIMACS:
 8972 -8973  8974  910 -8975 0
 8972 -8973  8974  910 -8976 0
 8972 -8973  8974  910  8977 0

c  1-1 --> 0
c    (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0 ∧ -p_910) -> (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧ -b^{5, 183}_0)
c  in CNF:
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_2
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_1
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_0
c  in DIMACS:
 8972  8973 -8974  910 -8975 0
 8972  8973 -8974  910 -8976 0
 8972  8973 -8974  910 -8977 0

c  0-1 --> -1
c    (-b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧ -p_910) -> ( b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0)
c  in CNF:
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨  b^{5, 183}_2
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_1
c     b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨  b^{5, 183}_0
c  in DIMACS:
 8972  8973  8974  910  8975 0
 8972  8973  8974  910 -8976 0
 8972  8973  8974  910  8977 0

c  -1-1 --> -2
c    ( b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧  b^{5, 182}_0 ∧ -p_910) -> ( b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0)
c  in CNF:
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨  b^{5, 183}_2
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨  b^{5, 183}_1
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨  p_910 ∨ -b^{5, 183}_0
c  in DIMACS:
-8972  8973 -8974  910  8975 0
-8972  8973 -8974  910  8976 0
-8972  8973 -8974  910 -8977 0

c  -2-1 --> break 
c    ( b^{5, 182}_2 ∧  b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨  b^{5, 182}_0 ∨  p_910 ∨ break
c  in DIMACS:
-8972 -8973  8974  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 182}_2 ∧ -b^{5, 182}_1 ∧ -b^{5, 182}_0 ∧ true) 
c  in CNF:
c    -b^{5, 182}_2 ∨  b^{5, 182}_1 ∨  b^{5, 182}_0 ∨ false 
c  in DIMACS:
-8972  8973  8974  0

c  3 does not represent an automaton state.
c    -(-b^{5, 182}_2 ∧  b^{5, 182}_1 ∧  b^{5, 182}_0 ∧ true) 
c  in CNF:
c     b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ false 
c  in DIMACS:
 8972 -8973 -8974  0
c  -3 does not represent an automaton state.
c    -( b^{5, 182}_2 ∧  b^{5, 182}_1 ∧  b^{5, 182}_0 ∧ true) 
c  in CNF:
c    -b^{5, 182}_2 ∨ -b^{5, 182}_1 ∨ -b^{5, 182}_0 ∨ false 
c  in DIMACS:
-8972 -8973 -8974  0

c i = 183
c  -2+1 --> -1
c    ( b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧  p_915) -> ( b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0)
c  in CNF:
c    -b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨  b^{5, 184}_2
c    -b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_1
c    -b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨  b^{5, 184}_0
c  in DIMACS:
-8975 -8976  8977 -915  8978 0
-8975 -8976  8977 -915 -8979 0
-8975 -8976  8977 -915  8980 0

c  -1+1 --> 0
c    ( b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0 ∧  p_915) -> (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧ -b^{5, 184}_0)
c  in CNF:
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_2
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_1
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_0
c  in DIMACS:
-8975  8976 -8977 -915 -8978 0
-8975  8976 -8977 -915 -8979 0
-8975  8976 -8977 -915 -8980 0

c  0+1 --> 1
c    (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧  p_915) -> (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0)
c  in CNF:
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_2
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_1
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨  b^{5, 184}_0
c  in DIMACS:
 8975  8976  8977 -915 -8978 0
 8975  8976  8977 -915 -8979 0
 8975  8976  8977 -915  8980 0

c  1+1 --> 2
c    (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0 ∧  p_915) -> (-b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0)
c  in CNF:
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_2
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨  b^{5, 184}_1
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ -p_915 ∨ -b^{5, 184}_0
c  in DIMACS:
 8975  8976 -8977 -915 -8978 0
 8975  8976 -8977 -915  8979 0
 8975  8976 -8977 -915 -8980 0

c  2+1 --> break 
c    (-b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧  p_915) -> break
c  in CNF:
c     b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 8975 -8976  8977 -915 1162 0


c  2-1 --> 1
c    (-b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧ -p_915) -> (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0)
c  in CNF:
c     b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_2
c     b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_1
c     b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨  b^{5, 184}_0
c  in DIMACS:
 8975 -8976  8977  915 -8978 0
 8975 -8976  8977  915 -8979 0
 8975 -8976  8977  915  8980 0

c  1-1 --> 0
c    (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0 ∧ -p_915) -> (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧ -b^{5, 184}_0)
c  in CNF:
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_2
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_1
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_0
c  in DIMACS:
 8975  8976 -8977  915 -8978 0
 8975  8976 -8977  915 -8979 0
 8975  8976 -8977  915 -8980 0

c  0-1 --> -1
c    (-b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧ -p_915) -> ( b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0)
c  in CNF:
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨  b^{5, 184}_2
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_1
c     b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨  b^{5, 184}_0
c  in DIMACS:
 8975  8976  8977  915  8978 0
 8975  8976  8977  915 -8979 0
 8975  8976  8977  915  8980 0

c  -1-1 --> -2
c    ( b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧  b^{5, 183}_0 ∧ -p_915) -> ( b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0)
c  in CNF:
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨  b^{5, 184}_2
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨  b^{5, 184}_1
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨  p_915 ∨ -b^{5, 184}_0
c  in DIMACS:
-8975  8976 -8977  915  8978 0
-8975  8976 -8977  915  8979 0
-8975  8976 -8977  915 -8980 0

c  -2-1 --> break 
c    ( b^{5, 183}_2 ∧  b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨  b^{5, 183}_0 ∨  p_915 ∨ break
c  in DIMACS:
-8975 -8976  8977  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 183}_2 ∧ -b^{5, 183}_1 ∧ -b^{5, 183}_0 ∧ true) 
c  in CNF:
c    -b^{5, 183}_2 ∨  b^{5, 183}_1 ∨  b^{5, 183}_0 ∨ false 
c  in DIMACS:
-8975  8976  8977  0

c  3 does not represent an automaton state.
c    -(-b^{5, 183}_2 ∧  b^{5, 183}_1 ∧  b^{5, 183}_0 ∧ true) 
c  in CNF:
c     b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ false 
c  in DIMACS:
 8975 -8976 -8977  0
c  -3 does not represent an automaton state.
c    -( b^{5, 183}_2 ∧  b^{5, 183}_1 ∧  b^{5, 183}_0 ∧ true) 
c  in CNF:
c    -b^{5, 183}_2 ∨ -b^{5, 183}_1 ∨ -b^{5, 183}_0 ∨ false 
c  in DIMACS:
-8975 -8976 -8977  0

c i = 184
c  -2+1 --> -1
c    ( b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧  p_920) -> ( b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0)
c  in CNF:
c    -b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨  b^{5, 185}_2
c    -b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_1
c    -b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨  b^{5, 185}_0
c  in DIMACS:
-8978 -8979  8980 -920  8981 0
-8978 -8979  8980 -920 -8982 0
-8978 -8979  8980 -920  8983 0

c  -1+1 --> 0
c    ( b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0 ∧  p_920) -> (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧ -b^{5, 185}_0)
c  in CNF:
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_2
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_1
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_0
c  in DIMACS:
-8978  8979 -8980 -920 -8981 0
-8978  8979 -8980 -920 -8982 0
-8978  8979 -8980 -920 -8983 0

c  0+1 --> 1
c    (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧  p_920) -> (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0)
c  in CNF:
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_2
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_1
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨  b^{5, 185}_0
c  in DIMACS:
 8978  8979  8980 -920 -8981 0
 8978  8979  8980 -920 -8982 0
 8978  8979  8980 -920  8983 0

c  1+1 --> 2
c    (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0 ∧  p_920) -> (-b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0)
c  in CNF:
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_2
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨  b^{5, 185}_1
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ -p_920 ∨ -b^{5, 185}_0
c  in DIMACS:
 8978  8979 -8980 -920 -8981 0
 8978  8979 -8980 -920  8982 0
 8978  8979 -8980 -920 -8983 0

c  2+1 --> break 
c    (-b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧  p_920) -> break
c  in CNF:
c     b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 8978 -8979  8980 -920 1162 0


c  2-1 --> 1
c    (-b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧ -p_920) -> (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0)
c  in CNF:
c     b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_2
c     b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_1
c     b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨  b^{5, 185}_0
c  in DIMACS:
 8978 -8979  8980  920 -8981 0
 8978 -8979  8980  920 -8982 0
 8978 -8979  8980  920  8983 0

c  1-1 --> 0
c    (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0 ∧ -p_920) -> (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧ -b^{5, 185}_0)
c  in CNF:
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_2
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_1
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_0
c  in DIMACS:
 8978  8979 -8980  920 -8981 0
 8978  8979 -8980  920 -8982 0
 8978  8979 -8980  920 -8983 0

c  0-1 --> -1
c    (-b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧ -p_920) -> ( b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0)
c  in CNF:
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨  b^{5, 185}_2
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_1
c     b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨  b^{5, 185}_0
c  in DIMACS:
 8978  8979  8980  920  8981 0
 8978  8979  8980  920 -8982 0
 8978  8979  8980  920  8983 0

c  -1-1 --> -2
c    ( b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧  b^{5, 184}_0 ∧ -p_920) -> ( b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0)
c  in CNF:
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨  b^{5, 185}_2
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨  b^{5, 185}_1
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨  p_920 ∨ -b^{5, 185}_0
c  in DIMACS:
-8978  8979 -8980  920  8981 0
-8978  8979 -8980  920  8982 0
-8978  8979 -8980  920 -8983 0

c  -2-1 --> break 
c    ( b^{5, 184}_2 ∧  b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨  b^{5, 184}_0 ∨  p_920 ∨ break
c  in DIMACS:
-8978 -8979  8980  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 184}_2 ∧ -b^{5, 184}_1 ∧ -b^{5, 184}_0 ∧ true) 
c  in CNF:
c    -b^{5, 184}_2 ∨  b^{5, 184}_1 ∨  b^{5, 184}_0 ∨ false 
c  in DIMACS:
-8978  8979  8980  0

c  3 does not represent an automaton state.
c    -(-b^{5, 184}_2 ∧  b^{5, 184}_1 ∧  b^{5, 184}_0 ∧ true) 
c  in CNF:
c     b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ false 
c  in DIMACS:
 8978 -8979 -8980  0
c  -3 does not represent an automaton state.
c    -( b^{5, 184}_2 ∧  b^{5, 184}_1 ∧  b^{5, 184}_0 ∧ true) 
c  in CNF:
c    -b^{5, 184}_2 ∨ -b^{5, 184}_1 ∨ -b^{5, 184}_0 ∨ false 
c  in DIMACS:
-8978 -8979 -8980  0

c i = 185
c  -2+1 --> -1
c    ( b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧  p_925) -> ( b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0)
c  in CNF:
c    -b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨  b^{5, 186}_2
c    -b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_1
c    -b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨  b^{5, 186}_0
c  in DIMACS:
-8981 -8982  8983 -925  8984 0
-8981 -8982  8983 -925 -8985 0
-8981 -8982  8983 -925  8986 0

c  -1+1 --> 0
c    ( b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0 ∧  p_925) -> (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧ -b^{5, 186}_0)
c  in CNF:
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_2
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_1
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_0
c  in DIMACS:
-8981  8982 -8983 -925 -8984 0
-8981  8982 -8983 -925 -8985 0
-8981  8982 -8983 -925 -8986 0

c  0+1 --> 1
c    (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧  p_925) -> (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0)
c  in CNF:
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_2
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_1
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨  b^{5, 186}_0
c  in DIMACS:
 8981  8982  8983 -925 -8984 0
 8981  8982  8983 -925 -8985 0
 8981  8982  8983 -925  8986 0

c  1+1 --> 2
c    (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0 ∧  p_925) -> (-b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0)
c  in CNF:
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_2
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨  b^{5, 186}_1
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ -p_925 ∨ -b^{5, 186}_0
c  in DIMACS:
 8981  8982 -8983 -925 -8984 0
 8981  8982 -8983 -925  8985 0
 8981  8982 -8983 -925 -8986 0

c  2+1 --> break 
c    (-b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧  p_925) -> break
c  in CNF:
c     b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ -p_925 ∨ break
c  in DIMACS:
 8981 -8982  8983 -925 1162 0


c  2-1 --> 1
c    (-b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧ -p_925) -> (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0)
c  in CNF:
c     b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_2
c     b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_1
c     b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨  b^{5, 186}_0
c  in DIMACS:
 8981 -8982  8983  925 -8984 0
 8981 -8982  8983  925 -8985 0
 8981 -8982  8983  925  8986 0

c  1-1 --> 0
c    (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0 ∧ -p_925) -> (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧ -b^{5, 186}_0)
c  in CNF:
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_2
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_1
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_0
c  in DIMACS:
 8981  8982 -8983  925 -8984 0
 8981  8982 -8983  925 -8985 0
 8981  8982 -8983  925 -8986 0

c  0-1 --> -1
c    (-b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧ -p_925) -> ( b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0)
c  in CNF:
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨  b^{5, 186}_2
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_1
c     b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨  b^{5, 186}_0
c  in DIMACS:
 8981  8982  8983  925  8984 0
 8981  8982  8983  925 -8985 0
 8981  8982  8983  925  8986 0

c  -1-1 --> -2
c    ( b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧  b^{5, 185}_0 ∧ -p_925) -> ( b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0)
c  in CNF:
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨  b^{5, 186}_2
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨  b^{5, 186}_1
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨  p_925 ∨ -b^{5, 186}_0
c  in DIMACS:
-8981  8982 -8983  925  8984 0
-8981  8982 -8983  925  8985 0
-8981  8982 -8983  925 -8986 0

c  -2-1 --> break 
c    ( b^{5, 185}_2 ∧  b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧ -p_925) -> break
c  in CNF:
c    -b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨  b^{5, 185}_0 ∨  p_925 ∨ break
c  in DIMACS:
-8981 -8982  8983  925 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 185}_2 ∧ -b^{5, 185}_1 ∧ -b^{5, 185}_0 ∧ true) 
c  in CNF:
c    -b^{5, 185}_2 ∨  b^{5, 185}_1 ∨  b^{5, 185}_0 ∨ false 
c  in DIMACS:
-8981  8982  8983  0

c  3 does not represent an automaton state.
c    -(-b^{5, 185}_2 ∧  b^{5, 185}_1 ∧  b^{5, 185}_0 ∧ true) 
c  in CNF:
c     b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ false 
c  in DIMACS:
 8981 -8982 -8983  0
c  -3 does not represent an automaton state.
c    -( b^{5, 185}_2 ∧  b^{5, 185}_1 ∧  b^{5, 185}_0 ∧ true) 
c  in CNF:
c    -b^{5, 185}_2 ∨ -b^{5, 185}_1 ∨ -b^{5, 185}_0 ∨ false 
c  in DIMACS:
-8981 -8982 -8983  0

c i = 186
c  -2+1 --> -1
c    ( b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧  p_930) -> ( b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0)
c  in CNF:
c    -b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨  b^{5, 187}_2
c    -b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_1
c    -b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨  b^{5, 187}_0
c  in DIMACS:
-8984 -8985  8986 -930  8987 0
-8984 -8985  8986 -930 -8988 0
-8984 -8985  8986 -930  8989 0

c  -1+1 --> 0
c    ( b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0 ∧  p_930) -> (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧ -b^{5, 187}_0)
c  in CNF:
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_2
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_1
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_0
c  in DIMACS:
-8984  8985 -8986 -930 -8987 0
-8984  8985 -8986 -930 -8988 0
-8984  8985 -8986 -930 -8989 0

c  0+1 --> 1
c    (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧  p_930) -> (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0)
c  in CNF:
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_2
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_1
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨  b^{5, 187}_0
c  in DIMACS:
 8984  8985  8986 -930 -8987 0
 8984  8985  8986 -930 -8988 0
 8984  8985  8986 -930  8989 0

c  1+1 --> 2
c    (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0 ∧  p_930) -> (-b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0)
c  in CNF:
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_2
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨  b^{5, 187}_1
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ -p_930 ∨ -b^{5, 187}_0
c  in DIMACS:
 8984  8985 -8986 -930 -8987 0
 8984  8985 -8986 -930  8988 0
 8984  8985 -8986 -930 -8989 0

c  2+1 --> break 
c    (-b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧  p_930) -> break
c  in CNF:
c     b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 8984 -8985  8986 -930 1162 0


c  2-1 --> 1
c    (-b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧ -p_930) -> (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0)
c  in CNF:
c     b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_2
c     b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_1
c     b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨  b^{5, 187}_0
c  in DIMACS:
 8984 -8985  8986  930 -8987 0
 8984 -8985  8986  930 -8988 0
 8984 -8985  8986  930  8989 0

c  1-1 --> 0
c    (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0 ∧ -p_930) -> (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧ -b^{5, 187}_0)
c  in CNF:
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_2
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_1
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_0
c  in DIMACS:
 8984  8985 -8986  930 -8987 0
 8984  8985 -8986  930 -8988 0
 8984  8985 -8986  930 -8989 0

c  0-1 --> -1
c    (-b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧ -p_930) -> ( b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0)
c  in CNF:
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨  b^{5, 187}_2
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_1
c     b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨  b^{5, 187}_0
c  in DIMACS:
 8984  8985  8986  930  8987 0
 8984  8985  8986  930 -8988 0
 8984  8985  8986  930  8989 0

c  -1-1 --> -2
c    ( b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧  b^{5, 186}_0 ∧ -p_930) -> ( b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0)
c  in CNF:
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨  b^{5, 187}_2
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨  b^{5, 187}_1
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨  p_930 ∨ -b^{5, 187}_0
c  in DIMACS:
-8984  8985 -8986  930  8987 0
-8984  8985 -8986  930  8988 0
-8984  8985 -8986  930 -8989 0

c  -2-1 --> break 
c    ( b^{5, 186}_2 ∧  b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨  b^{5, 186}_0 ∨  p_930 ∨ break
c  in DIMACS:
-8984 -8985  8986  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 186}_2 ∧ -b^{5, 186}_1 ∧ -b^{5, 186}_0 ∧ true) 
c  in CNF:
c    -b^{5, 186}_2 ∨  b^{5, 186}_1 ∨  b^{5, 186}_0 ∨ false 
c  in DIMACS:
-8984  8985  8986  0

c  3 does not represent an automaton state.
c    -(-b^{5, 186}_2 ∧  b^{5, 186}_1 ∧  b^{5, 186}_0 ∧ true) 
c  in CNF:
c     b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ false 
c  in DIMACS:
 8984 -8985 -8986  0
c  -3 does not represent an automaton state.
c    -( b^{5, 186}_2 ∧  b^{5, 186}_1 ∧  b^{5, 186}_0 ∧ true) 
c  in CNF:
c    -b^{5, 186}_2 ∨ -b^{5, 186}_1 ∨ -b^{5, 186}_0 ∨ false 
c  in DIMACS:
-8984 -8985 -8986  0

c i = 187
c  -2+1 --> -1
c    ( b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧  p_935) -> ( b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0)
c  in CNF:
c    -b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨  b^{5, 188}_2
c    -b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_1
c    -b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨  b^{5, 188}_0
c  in DIMACS:
-8987 -8988  8989 -935  8990 0
-8987 -8988  8989 -935 -8991 0
-8987 -8988  8989 -935  8992 0

c  -1+1 --> 0
c    ( b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0 ∧  p_935) -> (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧ -b^{5, 188}_0)
c  in CNF:
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_2
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_1
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_0
c  in DIMACS:
-8987  8988 -8989 -935 -8990 0
-8987  8988 -8989 -935 -8991 0
-8987  8988 -8989 -935 -8992 0

c  0+1 --> 1
c    (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧  p_935) -> (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0)
c  in CNF:
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_2
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_1
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨  b^{5, 188}_0
c  in DIMACS:
 8987  8988  8989 -935 -8990 0
 8987  8988  8989 -935 -8991 0
 8987  8988  8989 -935  8992 0

c  1+1 --> 2
c    (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0 ∧  p_935) -> (-b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0)
c  in CNF:
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_2
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨  b^{5, 188}_1
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ -p_935 ∨ -b^{5, 188}_0
c  in DIMACS:
 8987  8988 -8989 -935 -8990 0
 8987  8988 -8989 -935  8991 0
 8987  8988 -8989 -935 -8992 0

c  2+1 --> break 
c    (-b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧  p_935) -> break
c  in CNF:
c     b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 8987 -8988  8989 -935 1162 0


c  2-1 --> 1
c    (-b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧ -p_935) -> (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0)
c  in CNF:
c     b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_2
c     b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_1
c     b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨  b^{5, 188}_0
c  in DIMACS:
 8987 -8988  8989  935 -8990 0
 8987 -8988  8989  935 -8991 0
 8987 -8988  8989  935  8992 0

c  1-1 --> 0
c    (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0 ∧ -p_935) -> (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧ -b^{5, 188}_0)
c  in CNF:
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_2
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_1
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_0
c  in DIMACS:
 8987  8988 -8989  935 -8990 0
 8987  8988 -8989  935 -8991 0
 8987  8988 -8989  935 -8992 0

c  0-1 --> -1
c    (-b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧ -p_935) -> ( b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0)
c  in CNF:
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨  b^{5, 188}_2
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_1
c     b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨  b^{5, 188}_0
c  in DIMACS:
 8987  8988  8989  935  8990 0
 8987  8988  8989  935 -8991 0
 8987  8988  8989  935  8992 0

c  -1-1 --> -2
c    ( b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧  b^{5, 187}_0 ∧ -p_935) -> ( b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0)
c  in CNF:
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨  b^{5, 188}_2
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨  b^{5, 188}_1
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨  p_935 ∨ -b^{5, 188}_0
c  in DIMACS:
-8987  8988 -8989  935  8990 0
-8987  8988 -8989  935  8991 0
-8987  8988 -8989  935 -8992 0

c  -2-1 --> break 
c    ( b^{5, 187}_2 ∧  b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨  b^{5, 187}_0 ∨  p_935 ∨ break
c  in DIMACS:
-8987 -8988  8989  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 187}_2 ∧ -b^{5, 187}_1 ∧ -b^{5, 187}_0 ∧ true) 
c  in CNF:
c    -b^{5, 187}_2 ∨  b^{5, 187}_1 ∨  b^{5, 187}_0 ∨ false 
c  in DIMACS:
-8987  8988  8989  0

c  3 does not represent an automaton state.
c    -(-b^{5, 187}_2 ∧  b^{5, 187}_1 ∧  b^{5, 187}_0 ∧ true) 
c  in CNF:
c     b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ false 
c  in DIMACS:
 8987 -8988 -8989  0
c  -3 does not represent an automaton state.
c    -( b^{5, 187}_2 ∧  b^{5, 187}_1 ∧  b^{5, 187}_0 ∧ true) 
c  in CNF:
c    -b^{5, 187}_2 ∨ -b^{5, 187}_1 ∨ -b^{5, 187}_0 ∨ false 
c  in DIMACS:
-8987 -8988 -8989  0

c i = 188
c  -2+1 --> -1
c    ( b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧  p_940) -> ( b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0)
c  in CNF:
c    -b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨  b^{5, 189}_2
c    -b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_1
c    -b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨  b^{5, 189}_0
c  in DIMACS:
-8990 -8991  8992 -940  8993 0
-8990 -8991  8992 -940 -8994 0
-8990 -8991  8992 -940  8995 0

c  -1+1 --> 0
c    ( b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0 ∧  p_940) -> (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧ -b^{5, 189}_0)
c  in CNF:
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_2
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_1
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_0
c  in DIMACS:
-8990  8991 -8992 -940 -8993 0
-8990  8991 -8992 -940 -8994 0
-8990  8991 -8992 -940 -8995 0

c  0+1 --> 1
c    (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧  p_940) -> (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0)
c  in CNF:
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_2
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_1
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨  b^{5, 189}_0
c  in DIMACS:
 8990  8991  8992 -940 -8993 0
 8990  8991  8992 -940 -8994 0
 8990  8991  8992 -940  8995 0

c  1+1 --> 2
c    (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0 ∧  p_940) -> (-b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0)
c  in CNF:
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_2
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨  b^{5, 189}_1
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ -p_940 ∨ -b^{5, 189}_0
c  in DIMACS:
 8990  8991 -8992 -940 -8993 0
 8990  8991 -8992 -940  8994 0
 8990  8991 -8992 -940 -8995 0

c  2+1 --> break 
c    (-b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧  p_940) -> break
c  in CNF:
c     b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 8990 -8991  8992 -940 1162 0


c  2-1 --> 1
c    (-b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧ -p_940) -> (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0)
c  in CNF:
c     b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_2
c     b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_1
c     b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨  b^{5, 189}_0
c  in DIMACS:
 8990 -8991  8992  940 -8993 0
 8990 -8991  8992  940 -8994 0
 8990 -8991  8992  940  8995 0

c  1-1 --> 0
c    (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0 ∧ -p_940) -> (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧ -b^{5, 189}_0)
c  in CNF:
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_2
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_1
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_0
c  in DIMACS:
 8990  8991 -8992  940 -8993 0
 8990  8991 -8992  940 -8994 0
 8990  8991 -8992  940 -8995 0

c  0-1 --> -1
c    (-b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧ -p_940) -> ( b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0)
c  in CNF:
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨  b^{5, 189}_2
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_1
c     b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨  b^{5, 189}_0
c  in DIMACS:
 8990  8991  8992  940  8993 0
 8990  8991  8992  940 -8994 0
 8990  8991  8992  940  8995 0

c  -1-1 --> -2
c    ( b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧  b^{5, 188}_0 ∧ -p_940) -> ( b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0)
c  in CNF:
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨  b^{5, 189}_2
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨  b^{5, 189}_1
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨  p_940 ∨ -b^{5, 189}_0
c  in DIMACS:
-8990  8991 -8992  940  8993 0
-8990  8991 -8992  940  8994 0
-8990  8991 -8992  940 -8995 0

c  -2-1 --> break 
c    ( b^{5, 188}_2 ∧  b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨  b^{5, 188}_0 ∨  p_940 ∨ break
c  in DIMACS:
-8990 -8991  8992  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 188}_2 ∧ -b^{5, 188}_1 ∧ -b^{5, 188}_0 ∧ true) 
c  in CNF:
c    -b^{5, 188}_2 ∨  b^{5, 188}_1 ∨  b^{5, 188}_0 ∨ false 
c  in DIMACS:
-8990  8991  8992  0

c  3 does not represent an automaton state.
c    -(-b^{5, 188}_2 ∧  b^{5, 188}_1 ∧  b^{5, 188}_0 ∧ true) 
c  in CNF:
c     b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ false 
c  in DIMACS:
 8990 -8991 -8992  0
c  -3 does not represent an automaton state.
c    -( b^{5, 188}_2 ∧  b^{5, 188}_1 ∧  b^{5, 188}_0 ∧ true) 
c  in CNF:
c    -b^{5, 188}_2 ∨ -b^{5, 188}_1 ∨ -b^{5, 188}_0 ∨ false 
c  in DIMACS:
-8990 -8991 -8992  0

c i = 189
c  -2+1 --> -1
c    ( b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧  p_945) -> ( b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0)
c  in CNF:
c    -b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨  b^{5, 190}_2
c    -b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_1
c    -b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨  b^{5, 190}_0
c  in DIMACS:
-8993 -8994  8995 -945  8996 0
-8993 -8994  8995 -945 -8997 0
-8993 -8994  8995 -945  8998 0

c  -1+1 --> 0
c    ( b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0 ∧  p_945) -> (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧ -b^{5, 190}_0)
c  in CNF:
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_2
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_1
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_0
c  in DIMACS:
-8993  8994 -8995 -945 -8996 0
-8993  8994 -8995 -945 -8997 0
-8993  8994 -8995 -945 -8998 0

c  0+1 --> 1
c    (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧  p_945) -> (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0)
c  in CNF:
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_2
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_1
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨  b^{5, 190}_0
c  in DIMACS:
 8993  8994  8995 -945 -8996 0
 8993  8994  8995 -945 -8997 0
 8993  8994  8995 -945  8998 0

c  1+1 --> 2
c    (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0 ∧  p_945) -> (-b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0)
c  in CNF:
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_2
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨  b^{5, 190}_1
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ -p_945 ∨ -b^{5, 190}_0
c  in DIMACS:
 8993  8994 -8995 -945 -8996 0
 8993  8994 -8995 -945  8997 0
 8993  8994 -8995 -945 -8998 0

c  2+1 --> break 
c    (-b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧  p_945) -> break
c  in CNF:
c     b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 8993 -8994  8995 -945 1162 0


c  2-1 --> 1
c    (-b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧ -p_945) -> (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0)
c  in CNF:
c     b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_2
c     b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_1
c     b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨  b^{5, 190}_0
c  in DIMACS:
 8993 -8994  8995  945 -8996 0
 8993 -8994  8995  945 -8997 0
 8993 -8994  8995  945  8998 0

c  1-1 --> 0
c    (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0 ∧ -p_945) -> (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧ -b^{5, 190}_0)
c  in CNF:
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_2
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_1
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_0
c  in DIMACS:
 8993  8994 -8995  945 -8996 0
 8993  8994 -8995  945 -8997 0
 8993  8994 -8995  945 -8998 0

c  0-1 --> -1
c    (-b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧ -p_945) -> ( b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0)
c  in CNF:
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨  b^{5, 190}_2
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_1
c     b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨  b^{5, 190}_0
c  in DIMACS:
 8993  8994  8995  945  8996 0
 8993  8994  8995  945 -8997 0
 8993  8994  8995  945  8998 0

c  -1-1 --> -2
c    ( b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧  b^{5, 189}_0 ∧ -p_945) -> ( b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0)
c  in CNF:
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨  b^{5, 190}_2
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨  b^{5, 190}_1
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨  p_945 ∨ -b^{5, 190}_0
c  in DIMACS:
-8993  8994 -8995  945  8996 0
-8993  8994 -8995  945  8997 0
-8993  8994 -8995  945 -8998 0

c  -2-1 --> break 
c    ( b^{5, 189}_2 ∧  b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨  b^{5, 189}_0 ∨  p_945 ∨ break
c  in DIMACS:
-8993 -8994  8995  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 189}_2 ∧ -b^{5, 189}_1 ∧ -b^{5, 189}_0 ∧ true) 
c  in CNF:
c    -b^{5, 189}_2 ∨  b^{5, 189}_1 ∨  b^{5, 189}_0 ∨ false 
c  in DIMACS:
-8993  8994  8995  0

c  3 does not represent an automaton state.
c    -(-b^{5, 189}_2 ∧  b^{5, 189}_1 ∧  b^{5, 189}_0 ∧ true) 
c  in CNF:
c     b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ false 
c  in DIMACS:
 8993 -8994 -8995  0
c  -3 does not represent an automaton state.
c    -( b^{5, 189}_2 ∧  b^{5, 189}_1 ∧  b^{5, 189}_0 ∧ true) 
c  in CNF:
c    -b^{5, 189}_2 ∨ -b^{5, 189}_1 ∨ -b^{5, 189}_0 ∨ false 
c  in DIMACS:
-8993 -8994 -8995  0

c i = 190
c  -2+1 --> -1
c    ( b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧  p_950) -> ( b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0)
c  in CNF:
c    -b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨  b^{5, 191}_2
c    -b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_1
c    -b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨  b^{5, 191}_0
c  in DIMACS:
-8996 -8997  8998 -950  8999 0
-8996 -8997  8998 -950 -9000 0
-8996 -8997  8998 -950  9001 0

c  -1+1 --> 0
c    ( b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0 ∧  p_950) -> (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧ -b^{5, 191}_0)
c  in CNF:
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_2
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_1
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_0
c  in DIMACS:
-8996  8997 -8998 -950 -8999 0
-8996  8997 -8998 -950 -9000 0
-8996  8997 -8998 -950 -9001 0

c  0+1 --> 1
c    (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧  p_950) -> (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0)
c  in CNF:
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_2
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_1
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨  b^{5, 191}_0
c  in DIMACS:
 8996  8997  8998 -950 -8999 0
 8996  8997  8998 -950 -9000 0
 8996  8997  8998 -950  9001 0

c  1+1 --> 2
c    (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0 ∧  p_950) -> (-b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0)
c  in CNF:
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_2
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨  b^{5, 191}_1
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ -p_950 ∨ -b^{5, 191}_0
c  in DIMACS:
 8996  8997 -8998 -950 -8999 0
 8996  8997 -8998 -950  9000 0
 8996  8997 -8998 -950 -9001 0

c  2+1 --> break 
c    (-b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧  p_950) -> break
c  in CNF:
c     b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 8996 -8997  8998 -950 1162 0


c  2-1 --> 1
c    (-b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧ -p_950) -> (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0)
c  in CNF:
c     b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_2
c     b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_1
c     b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨  b^{5, 191}_0
c  in DIMACS:
 8996 -8997  8998  950 -8999 0
 8996 -8997  8998  950 -9000 0
 8996 -8997  8998  950  9001 0

c  1-1 --> 0
c    (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0 ∧ -p_950) -> (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧ -b^{5, 191}_0)
c  in CNF:
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_2
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_1
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_0
c  in DIMACS:
 8996  8997 -8998  950 -8999 0
 8996  8997 -8998  950 -9000 0
 8996  8997 -8998  950 -9001 0

c  0-1 --> -1
c    (-b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧ -p_950) -> ( b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0)
c  in CNF:
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨  b^{5, 191}_2
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_1
c     b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨  b^{5, 191}_0
c  in DIMACS:
 8996  8997  8998  950  8999 0
 8996  8997  8998  950 -9000 0
 8996  8997  8998  950  9001 0

c  -1-1 --> -2
c    ( b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧  b^{5, 190}_0 ∧ -p_950) -> ( b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0)
c  in CNF:
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨  b^{5, 191}_2
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨  b^{5, 191}_1
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨  p_950 ∨ -b^{5, 191}_0
c  in DIMACS:
-8996  8997 -8998  950  8999 0
-8996  8997 -8998  950  9000 0
-8996  8997 -8998  950 -9001 0

c  -2-1 --> break 
c    ( b^{5, 190}_2 ∧  b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨  b^{5, 190}_0 ∨  p_950 ∨ break
c  in DIMACS:
-8996 -8997  8998  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 190}_2 ∧ -b^{5, 190}_1 ∧ -b^{5, 190}_0 ∧ true) 
c  in CNF:
c    -b^{5, 190}_2 ∨  b^{5, 190}_1 ∨  b^{5, 190}_0 ∨ false 
c  in DIMACS:
-8996  8997  8998  0

c  3 does not represent an automaton state.
c    -(-b^{5, 190}_2 ∧  b^{5, 190}_1 ∧  b^{5, 190}_0 ∧ true) 
c  in CNF:
c     b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ false 
c  in DIMACS:
 8996 -8997 -8998  0
c  -3 does not represent an automaton state.
c    -( b^{5, 190}_2 ∧  b^{5, 190}_1 ∧  b^{5, 190}_0 ∧ true) 
c  in CNF:
c    -b^{5, 190}_2 ∨ -b^{5, 190}_1 ∨ -b^{5, 190}_0 ∨ false 
c  in DIMACS:
-8996 -8997 -8998  0

c i = 191
c  -2+1 --> -1
c    ( b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧  p_955) -> ( b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0)
c  in CNF:
c    -b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨  b^{5, 192}_2
c    -b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_1
c    -b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨  b^{5, 192}_0
c  in DIMACS:
-8999 -9000  9001 -955  9002 0
-8999 -9000  9001 -955 -9003 0
-8999 -9000  9001 -955  9004 0

c  -1+1 --> 0
c    ( b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0 ∧  p_955) -> (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧ -b^{5, 192}_0)
c  in CNF:
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_2
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_1
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_0
c  in DIMACS:
-8999  9000 -9001 -955 -9002 0
-8999  9000 -9001 -955 -9003 0
-8999  9000 -9001 -955 -9004 0

c  0+1 --> 1
c    (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧  p_955) -> (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0)
c  in CNF:
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_2
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_1
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨  b^{5, 192}_0
c  in DIMACS:
 8999  9000  9001 -955 -9002 0
 8999  9000  9001 -955 -9003 0
 8999  9000  9001 -955  9004 0

c  1+1 --> 2
c    (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0 ∧  p_955) -> (-b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0)
c  in CNF:
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_2
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨  b^{5, 192}_1
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ -p_955 ∨ -b^{5, 192}_0
c  in DIMACS:
 8999  9000 -9001 -955 -9002 0
 8999  9000 -9001 -955  9003 0
 8999  9000 -9001 -955 -9004 0

c  2+1 --> break 
c    (-b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧  p_955) -> break
c  in CNF:
c     b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ -p_955 ∨ break
c  in DIMACS:
 8999 -9000  9001 -955 1162 0


c  2-1 --> 1
c    (-b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧ -p_955) -> (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0)
c  in CNF:
c     b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_2
c     b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_1
c     b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨  b^{5, 192}_0
c  in DIMACS:
 8999 -9000  9001  955 -9002 0
 8999 -9000  9001  955 -9003 0
 8999 -9000  9001  955  9004 0

c  1-1 --> 0
c    (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0 ∧ -p_955) -> (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧ -b^{5, 192}_0)
c  in CNF:
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_2
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_1
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_0
c  in DIMACS:
 8999  9000 -9001  955 -9002 0
 8999  9000 -9001  955 -9003 0
 8999  9000 -9001  955 -9004 0

c  0-1 --> -1
c    (-b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧ -p_955) -> ( b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0)
c  in CNF:
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨  b^{5, 192}_2
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_1
c     b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨  b^{5, 192}_0
c  in DIMACS:
 8999  9000  9001  955  9002 0
 8999  9000  9001  955 -9003 0
 8999  9000  9001  955  9004 0

c  -1-1 --> -2
c    ( b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧  b^{5, 191}_0 ∧ -p_955) -> ( b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0)
c  in CNF:
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨  b^{5, 192}_2
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨  b^{5, 192}_1
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨  p_955 ∨ -b^{5, 192}_0
c  in DIMACS:
-8999  9000 -9001  955  9002 0
-8999  9000 -9001  955  9003 0
-8999  9000 -9001  955 -9004 0

c  -2-1 --> break 
c    ( b^{5, 191}_2 ∧  b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧ -p_955) -> break
c  in CNF:
c    -b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨  b^{5, 191}_0 ∨  p_955 ∨ break
c  in DIMACS:
-8999 -9000  9001  955 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 191}_2 ∧ -b^{5, 191}_1 ∧ -b^{5, 191}_0 ∧ true) 
c  in CNF:
c    -b^{5, 191}_2 ∨  b^{5, 191}_1 ∨  b^{5, 191}_0 ∨ false 
c  in DIMACS:
-8999  9000  9001  0

c  3 does not represent an automaton state.
c    -(-b^{5, 191}_2 ∧  b^{5, 191}_1 ∧  b^{5, 191}_0 ∧ true) 
c  in CNF:
c     b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ false 
c  in DIMACS:
 8999 -9000 -9001  0
c  -3 does not represent an automaton state.
c    -( b^{5, 191}_2 ∧  b^{5, 191}_1 ∧  b^{5, 191}_0 ∧ true) 
c  in CNF:
c    -b^{5, 191}_2 ∨ -b^{5, 191}_1 ∨ -b^{5, 191}_0 ∨ false 
c  in DIMACS:
-8999 -9000 -9001  0

c i = 192
c  -2+1 --> -1
c    ( b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧  p_960) -> ( b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0)
c  in CNF:
c    -b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨  b^{5, 193}_2
c    -b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_1
c    -b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨  b^{5, 193}_0
c  in DIMACS:
-9002 -9003  9004 -960  9005 0
-9002 -9003  9004 -960 -9006 0
-9002 -9003  9004 -960  9007 0

c  -1+1 --> 0
c    ( b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0 ∧  p_960) -> (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧ -b^{5, 193}_0)
c  in CNF:
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_2
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_1
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_0
c  in DIMACS:
-9002  9003 -9004 -960 -9005 0
-9002  9003 -9004 -960 -9006 0
-9002  9003 -9004 -960 -9007 0

c  0+1 --> 1
c    (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧  p_960) -> (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0)
c  in CNF:
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_2
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_1
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨  b^{5, 193}_0
c  in DIMACS:
 9002  9003  9004 -960 -9005 0
 9002  9003  9004 -960 -9006 0
 9002  9003  9004 -960  9007 0

c  1+1 --> 2
c    (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0 ∧  p_960) -> (-b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0)
c  in CNF:
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_2
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨  b^{5, 193}_1
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ -p_960 ∨ -b^{5, 193}_0
c  in DIMACS:
 9002  9003 -9004 -960 -9005 0
 9002  9003 -9004 -960  9006 0
 9002  9003 -9004 -960 -9007 0

c  2+1 --> break 
c    (-b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧  p_960) -> break
c  in CNF:
c     b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 9002 -9003  9004 -960 1162 0


c  2-1 --> 1
c    (-b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧ -p_960) -> (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0)
c  in CNF:
c     b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_2
c     b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_1
c     b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨  b^{5, 193}_0
c  in DIMACS:
 9002 -9003  9004  960 -9005 0
 9002 -9003  9004  960 -9006 0
 9002 -9003  9004  960  9007 0

c  1-1 --> 0
c    (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0 ∧ -p_960) -> (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧ -b^{5, 193}_0)
c  in CNF:
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_2
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_1
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_0
c  in DIMACS:
 9002  9003 -9004  960 -9005 0
 9002  9003 -9004  960 -9006 0
 9002  9003 -9004  960 -9007 0

c  0-1 --> -1
c    (-b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧ -p_960) -> ( b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0)
c  in CNF:
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨  b^{5, 193}_2
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_1
c     b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨  b^{5, 193}_0
c  in DIMACS:
 9002  9003  9004  960  9005 0
 9002  9003  9004  960 -9006 0
 9002  9003  9004  960  9007 0

c  -1-1 --> -2
c    ( b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧  b^{5, 192}_0 ∧ -p_960) -> ( b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0)
c  in CNF:
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨  b^{5, 193}_2
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨  b^{5, 193}_1
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨  p_960 ∨ -b^{5, 193}_0
c  in DIMACS:
-9002  9003 -9004  960  9005 0
-9002  9003 -9004  960  9006 0
-9002  9003 -9004  960 -9007 0

c  -2-1 --> break 
c    ( b^{5, 192}_2 ∧  b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨  b^{5, 192}_0 ∨  p_960 ∨ break
c  in DIMACS:
-9002 -9003  9004  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 192}_2 ∧ -b^{5, 192}_1 ∧ -b^{5, 192}_0 ∧ true) 
c  in CNF:
c    -b^{5, 192}_2 ∨  b^{5, 192}_1 ∨  b^{5, 192}_0 ∨ false 
c  in DIMACS:
-9002  9003  9004  0

c  3 does not represent an automaton state.
c    -(-b^{5, 192}_2 ∧  b^{5, 192}_1 ∧  b^{5, 192}_0 ∧ true) 
c  in CNF:
c     b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ false 
c  in DIMACS:
 9002 -9003 -9004  0
c  -3 does not represent an automaton state.
c    -( b^{5, 192}_2 ∧  b^{5, 192}_1 ∧  b^{5, 192}_0 ∧ true) 
c  in CNF:
c    -b^{5, 192}_2 ∨ -b^{5, 192}_1 ∨ -b^{5, 192}_0 ∨ false 
c  in DIMACS:
-9002 -9003 -9004  0

c i = 193
c  -2+1 --> -1
c    ( b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧  p_965) -> ( b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0)
c  in CNF:
c    -b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨  b^{5, 194}_2
c    -b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_1
c    -b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨  b^{5, 194}_0
c  in DIMACS:
-9005 -9006  9007 -965  9008 0
-9005 -9006  9007 -965 -9009 0
-9005 -9006  9007 -965  9010 0

c  -1+1 --> 0
c    ( b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0 ∧  p_965) -> (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧ -b^{5, 194}_0)
c  in CNF:
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_2
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_1
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_0
c  in DIMACS:
-9005  9006 -9007 -965 -9008 0
-9005  9006 -9007 -965 -9009 0
-9005  9006 -9007 -965 -9010 0

c  0+1 --> 1
c    (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧  p_965) -> (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0)
c  in CNF:
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_2
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_1
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨  b^{5, 194}_0
c  in DIMACS:
 9005  9006  9007 -965 -9008 0
 9005  9006  9007 -965 -9009 0
 9005  9006  9007 -965  9010 0

c  1+1 --> 2
c    (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0 ∧  p_965) -> (-b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0)
c  in CNF:
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_2
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨  b^{5, 194}_1
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ -p_965 ∨ -b^{5, 194}_0
c  in DIMACS:
 9005  9006 -9007 -965 -9008 0
 9005  9006 -9007 -965  9009 0
 9005  9006 -9007 -965 -9010 0

c  2+1 --> break 
c    (-b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧  p_965) -> break
c  in CNF:
c     b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ -p_965 ∨ break
c  in DIMACS:
 9005 -9006  9007 -965 1162 0


c  2-1 --> 1
c    (-b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧ -p_965) -> (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0)
c  in CNF:
c     b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_2
c     b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_1
c     b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨  b^{5, 194}_0
c  in DIMACS:
 9005 -9006  9007  965 -9008 0
 9005 -9006  9007  965 -9009 0
 9005 -9006  9007  965  9010 0

c  1-1 --> 0
c    (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0 ∧ -p_965) -> (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧ -b^{5, 194}_0)
c  in CNF:
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_2
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_1
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_0
c  in DIMACS:
 9005  9006 -9007  965 -9008 0
 9005  9006 -9007  965 -9009 0
 9005  9006 -9007  965 -9010 0

c  0-1 --> -1
c    (-b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧ -p_965) -> ( b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0)
c  in CNF:
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨  b^{5, 194}_2
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_1
c     b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨  b^{5, 194}_0
c  in DIMACS:
 9005  9006  9007  965  9008 0
 9005  9006  9007  965 -9009 0
 9005  9006  9007  965  9010 0

c  -1-1 --> -2
c    ( b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧  b^{5, 193}_0 ∧ -p_965) -> ( b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0)
c  in CNF:
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨  b^{5, 194}_2
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨  b^{5, 194}_1
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨  p_965 ∨ -b^{5, 194}_0
c  in DIMACS:
-9005  9006 -9007  965  9008 0
-9005  9006 -9007  965  9009 0
-9005  9006 -9007  965 -9010 0

c  -2-1 --> break 
c    ( b^{5, 193}_2 ∧  b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧ -p_965) -> break
c  in CNF:
c    -b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨  b^{5, 193}_0 ∨  p_965 ∨ break
c  in DIMACS:
-9005 -9006  9007  965 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 193}_2 ∧ -b^{5, 193}_1 ∧ -b^{5, 193}_0 ∧ true) 
c  in CNF:
c    -b^{5, 193}_2 ∨  b^{5, 193}_1 ∨  b^{5, 193}_0 ∨ false 
c  in DIMACS:
-9005  9006  9007  0

c  3 does not represent an automaton state.
c    -(-b^{5, 193}_2 ∧  b^{5, 193}_1 ∧  b^{5, 193}_0 ∧ true) 
c  in CNF:
c     b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ false 
c  in DIMACS:
 9005 -9006 -9007  0
c  -3 does not represent an automaton state.
c    -( b^{5, 193}_2 ∧  b^{5, 193}_1 ∧  b^{5, 193}_0 ∧ true) 
c  in CNF:
c    -b^{5, 193}_2 ∨ -b^{5, 193}_1 ∨ -b^{5, 193}_0 ∨ false 
c  in DIMACS:
-9005 -9006 -9007  0

c i = 194
c  -2+1 --> -1
c    ( b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧  p_970) -> ( b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0)
c  in CNF:
c    -b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨  b^{5, 195}_2
c    -b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_1
c    -b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨  b^{5, 195}_0
c  in DIMACS:
-9008 -9009  9010 -970  9011 0
-9008 -9009  9010 -970 -9012 0
-9008 -9009  9010 -970  9013 0

c  -1+1 --> 0
c    ( b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0 ∧  p_970) -> (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧ -b^{5, 195}_0)
c  in CNF:
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_2
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_1
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_0
c  in DIMACS:
-9008  9009 -9010 -970 -9011 0
-9008  9009 -9010 -970 -9012 0
-9008  9009 -9010 -970 -9013 0

c  0+1 --> 1
c    (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧  p_970) -> (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0)
c  in CNF:
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_2
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_1
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨  b^{5, 195}_0
c  in DIMACS:
 9008  9009  9010 -970 -9011 0
 9008  9009  9010 -970 -9012 0
 9008  9009  9010 -970  9013 0

c  1+1 --> 2
c    (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0 ∧  p_970) -> (-b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0)
c  in CNF:
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_2
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨  b^{5, 195}_1
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ -p_970 ∨ -b^{5, 195}_0
c  in DIMACS:
 9008  9009 -9010 -970 -9011 0
 9008  9009 -9010 -970  9012 0
 9008  9009 -9010 -970 -9013 0

c  2+1 --> break 
c    (-b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧  p_970) -> break
c  in CNF:
c     b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 9008 -9009  9010 -970 1162 0


c  2-1 --> 1
c    (-b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧ -p_970) -> (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0)
c  in CNF:
c     b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_2
c     b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_1
c     b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨  b^{5, 195}_0
c  in DIMACS:
 9008 -9009  9010  970 -9011 0
 9008 -9009  9010  970 -9012 0
 9008 -9009  9010  970  9013 0

c  1-1 --> 0
c    (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0 ∧ -p_970) -> (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧ -b^{5, 195}_0)
c  in CNF:
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_2
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_1
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_0
c  in DIMACS:
 9008  9009 -9010  970 -9011 0
 9008  9009 -9010  970 -9012 0
 9008  9009 -9010  970 -9013 0

c  0-1 --> -1
c    (-b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧ -p_970) -> ( b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0)
c  in CNF:
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨  b^{5, 195}_2
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_1
c     b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨  b^{5, 195}_0
c  in DIMACS:
 9008  9009  9010  970  9011 0
 9008  9009  9010  970 -9012 0
 9008  9009  9010  970  9013 0

c  -1-1 --> -2
c    ( b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧  b^{5, 194}_0 ∧ -p_970) -> ( b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0)
c  in CNF:
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨  b^{5, 195}_2
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨  b^{5, 195}_1
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨  p_970 ∨ -b^{5, 195}_0
c  in DIMACS:
-9008  9009 -9010  970  9011 0
-9008  9009 -9010  970  9012 0
-9008  9009 -9010  970 -9013 0

c  -2-1 --> break 
c    ( b^{5, 194}_2 ∧  b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨  b^{5, 194}_0 ∨  p_970 ∨ break
c  in DIMACS:
-9008 -9009  9010  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 194}_2 ∧ -b^{5, 194}_1 ∧ -b^{5, 194}_0 ∧ true) 
c  in CNF:
c    -b^{5, 194}_2 ∨  b^{5, 194}_1 ∨  b^{5, 194}_0 ∨ false 
c  in DIMACS:
-9008  9009  9010  0

c  3 does not represent an automaton state.
c    -(-b^{5, 194}_2 ∧  b^{5, 194}_1 ∧  b^{5, 194}_0 ∧ true) 
c  in CNF:
c     b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ false 
c  in DIMACS:
 9008 -9009 -9010  0
c  -3 does not represent an automaton state.
c    -( b^{5, 194}_2 ∧  b^{5, 194}_1 ∧  b^{5, 194}_0 ∧ true) 
c  in CNF:
c    -b^{5, 194}_2 ∨ -b^{5, 194}_1 ∨ -b^{5, 194}_0 ∨ false 
c  in DIMACS:
-9008 -9009 -9010  0

c i = 195
c  -2+1 --> -1
c    ( b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧  p_975) -> ( b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0)
c  in CNF:
c    -b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨  b^{5, 196}_2
c    -b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_1
c    -b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨  b^{5, 196}_0
c  in DIMACS:
-9011 -9012  9013 -975  9014 0
-9011 -9012  9013 -975 -9015 0
-9011 -9012  9013 -975  9016 0

c  -1+1 --> 0
c    ( b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0 ∧  p_975) -> (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧ -b^{5, 196}_0)
c  in CNF:
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_2
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_1
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_0
c  in DIMACS:
-9011  9012 -9013 -975 -9014 0
-9011  9012 -9013 -975 -9015 0
-9011  9012 -9013 -975 -9016 0

c  0+1 --> 1
c    (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧  p_975) -> (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0)
c  in CNF:
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_2
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_1
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨  b^{5, 196}_0
c  in DIMACS:
 9011  9012  9013 -975 -9014 0
 9011  9012  9013 -975 -9015 0
 9011  9012  9013 -975  9016 0

c  1+1 --> 2
c    (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0 ∧  p_975) -> (-b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0)
c  in CNF:
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_2
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨  b^{5, 196}_1
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ -p_975 ∨ -b^{5, 196}_0
c  in DIMACS:
 9011  9012 -9013 -975 -9014 0
 9011  9012 -9013 -975  9015 0
 9011  9012 -9013 -975 -9016 0

c  2+1 --> break 
c    (-b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧  p_975) -> break
c  in CNF:
c     b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 9011 -9012  9013 -975 1162 0


c  2-1 --> 1
c    (-b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧ -p_975) -> (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0)
c  in CNF:
c     b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_2
c     b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_1
c     b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨  b^{5, 196}_0
c  in DIMACS:
 9011 -9012  9013  975 -9014 0
 9011 -9012  9013  975 -9015 0
 9011 -9012  9013  975  9016 0

c  1-1 --> 0
c    (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0 ∧ -p_975) -> (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧ -b^{5, 196}_0)
c  in CNF:
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_2
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_1
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_0
c  in DIMACS:
 9011  9012 -9013  975 -9014 0
 9011  9012 -9013  975 -9015 0
 9011  9012 -9013  975 -9016 0

c  0-1 --> -1
c    (-b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧ -p_975) -> ( b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0)
c  in CNF:
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨  b^{5, 196}_2
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_1
c     b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨  b^{5, 196}_0
c  in DIMACS:
 9011  9012  9013  975  9014 0
 9011  9012  9013  975 -9015 0
 9011  9012  9013  975  9016 0

c  -1-1 --> -2
c    ( b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧  b^{5, 195}_0 ∧ -p_975) -> ( b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0)
c  in CNF:
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨  b^{5, 196}_2
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨  b^{5, 196}_1
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨  p_975 ∨ -b^{5, 196}_0
c  in DIMACS:
-9011  9012 -9013  975  9014 0
-9011  9012 -9013  975  9015 0
-9011  9012 -9013  975 -9016 0

c  -2-1 --> break 
c    ( b^{5, 195}_2 ∧  b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨  b^{5, 195}_0 ∨  p_975 ∨ break
c  in DIMACS:
-9011 -9012  9013  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 195}_2 ∧ -b^{5, 195}_1 ∧ -b^{5, 195}_0 ∧ true) 
c  in CNF:
c    -b^{5, 195}_2 ∨  b^{5, 195}_1 ∨  b^{5, 195}_0 ∨ false 
c  in DIMACS:
-9011  9012  9013  0

c  3 does not represent an automaton state.
c    -(-b^{5, 195}_2 ∧  b^{5, 195}_1 ∧  b^{5, 195}_0 ∧ true) 
c  in CNF:
c     b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ false 
c  in DIMACS:
 9011 -9012 -9013  0
c  -3 does not represent an automaton state.
c    -( b^{5, 195}_2 ∧  b^{5, 195}_1 ∧  b^{5, 195}_0 ∧ true) 
c  in CNF:
c    -b^{5, 195}_2 ∨ -b^{5, 195}_1 ∨ -b^{5, 195}_0 ∨ false 
c  in DIMACS:
-9011 -9012 -9013  0

c i = 196
c  -2+1 --> -1
c    ( b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧  p_980) -> ( b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0)
c  in CNF:
c    -b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨  b^{5, 197}_2
c    -b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_1
c    -b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨  b^{5, 197}_0
c  in DIMACS:
-9014 -9015  9016 -980  9017 0
-9014 -9015  9016 -980 -9018 0
-9014 -9015  9016 -980  9019 0

c  -1+1 --> 0
c    ( b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0 ∧  p_980) -> (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧ -b^{5, 197}_0)
c  in CNF:
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_2
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_1
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_0
c  in DIMACS:
-9014  9015 -9016 -980 -9017 0
-9014  9015 -9016 -980 -9018 0
-9014  9015 -9016 -980 -9019 0

c  0+1 --> 1
c    (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧  p_980) -> (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0)
c  in CNF:
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_2
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_1
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨  b^{5, 197}_0
c  in DIMACS:
 9014  9015  9016 -980 -9017 0
 9014  9015  9016 -980 -9018 0
 9014  9015  9016 -980  9019 0

c  1+1 --> 2
c    (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0 ∧  p_980) -> (-b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0)
c  in CNF:
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_2
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨  b^{5, 197}_1
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ -p_980 ∨ -b^{5, 197}_0
c  in DIMACS:
 9014  9015 -9016 -980 -9017 0
 9014  9015 -9016 -980  9018 0
 9014  9015 -9016 -980 -9019 0

c  2+1 --> break 
c    (-b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧  p_980) -> break
c  in CNF:
c     b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 9014 -9015  9016 -980 1162 0


c  2-1 --> 1
c    (-b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧ -p_980) -> (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0)
c  in CNF:
c     b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_2
c     b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_1
c     b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨  b^{5, 197}_0
c  in DIMACS:
 9014 -9015  9016  980 -9017 0
 9014 -9015  9016  980 -9018 0
 9014 -9015  9016  980  9019 0

c  1-1 --> 0
c    (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0 ∧ -p_980) -> (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧ -b^{5, 197}_0)
c  in CNF:
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_2
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_1
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_0
c  in DIMACS:
 9014  9015 -9016  980 -9017 0
 9014  9015 -9016  980 -9018 0
 9014  9015 -9016  980 -9019 0

c  0-1 --> -1
c    (-b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧ -p_980) -> ( b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0)
c  in CNF:
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨  b^{5, 197}_2
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_1
c     b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨  b^{5, 197}_0
c  in DIMACS:
 9014  9015  9016  980  9017 0
 9014  9015  9016  980 -9018 0
 9014  9015  9016  980  9019 0

c  -1-1 --> -2
c    ( b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧  b^{5, 196}_0 ∧ -p_980) -> ( b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0)
c  in CNF:
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨  b^{5, 197}_2
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨  b^{5, 197}_1
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨  p_980 ∨ -b^{5, 197}_0
c  in DIMACS:
-9014  9015 -9016  980  9017 0
-9014  9015 -9016  980  9018 0
-9014  9015 -9016  980 -9019 0

c  -2-1 --> break 
c    ( b^{5, 196}_2 ∧  b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨  b^{5, 196}_0 ∨  p_980 ∨ break
c  in DIMACS:
-9014 -9015  9016  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 196}_2 ∧ -b^{5, 196}_1 ∧ -b^{5, 196}_0 ∧ true) 
c  in CNF:
c    -b^{5, 196}_2 ∨  b^{5, 196}_1 ∨  b^{5, 196}_0 ∨ false 
c  in DIMACS:
-9014  9015  9016  0

c  3 does not represent an automaton state.
c    -(-b^{5, 196}_2 ∧  b^{5, 196}_1 ∧  b^{5, 196}_0 ∧ true) 
c  in CNF:
c     b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ false 
c  in DIMACS:
 9014 -9015 -9016  0
c  -3 does not represent an automaton state.
c    -( b^{5, 196}_2 ∧  b^{5, 196}_1 ∧  b^{5, 196}_0 ∧ true) 
c  in CNF:
c    -b^{5, 196}_2 ∨ -b^{5, 196}_1 ∨ -b^{5, 196}_0 ∨ false 
c  in DIMACS:
-9014 -9015 -9016  0

c i = 197
c  -2+1 --> -1
c    ( b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧  p_985) -> ( b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0)
c  in CNF:
c    -b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨  b^{5, 198}_2
c    -b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_1
c    -b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨  b^{5, 198}_0
c  in DIMACS:
-9017 -9018  9019 -985  9020 0
-9017 -9018  9019 -985 -9021 0
-9017 -9018  9019 -985  9022 0

c  -1+1 --> 0
c    ( b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0 ∧  p_985) -> (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧ -b^{5, 198}_0)
c  in CNF:
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_2
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_1
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_0
c  in DIMACS:
-9017  9018 -9019 -985 -9020 0
-9017  9018 -9019 -985 -9021 0
-9017  9018 -9019 -985 -9022 0

c  0+1 --> 1
c    (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧  p_985) -> (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0)
c  in CNF:
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_2
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_1
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨  b^{5, 198}_0
c  in DIMACS:
 9017  9018  9019 -985 -9020 0
 9017  9018  9019 -985 -9021 0
 9017  9018  9019 -985  9022 0

c  1+1 --> 2
c    (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0 ∧  p_985) -> (-b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0)
c  in CNF:
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_2
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨  b^{5, 198}_1
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ -p_985 ∨ -b^{5, 198}_0
c  in DIMACS:
 9017  9018 -9019 -985 -9020 0
 9017  9018 -9019 -985  9021 0
 9017  9018 -9019 -985 -9022 0

c  2+1 --> break 
c    (-b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧  p_985) -> break
c  in CNF:
c     b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ -p_985 ∨ break
c  in DIMACS:
 9017 -9018  9019 -985 1162 0


c  2-1 --> 1
c    (-b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧ -p_985) -> (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0)
c  in CNF:
c     b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_2
c     b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_1
c     b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨  b^{5, 198}_0
c  in DIMACS:
 9017 -9018  9019  985 -9020 0
 9017 -9018  9019  985 -9021 0
 9017 -9018  9019  985  9022 0

c  1-1 --> 0
c    (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0 ∧ -p_985) -> (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧ -b^{5, 198}_0)
c  in CNF:
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_2
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_1
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_0
c  in DIMACS:
 9017  9018 -9019  985 -9020 0
 9017  9018 -9019  985 -9021 0
 9017  9018 -9019  985 -9022 0

c  0-1 --> -1
c    (-b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧ -p_985) -> ( b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0)
c  in CNF:
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨  b^{5, 198}_2
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_1
c     b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨  b^{5, 198}_0
c  in DIMACS:
 9017  9018  9019  985  9020 0
 9017  9018  9019  985 -9021 0
 9017  9018  9019  985  9022 0

c  -1-1 --> -2
c    ( b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧  b^{5, 197}_0 ∧ -p_985) -> ( b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0)
c  in CNF:
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨  b^{5, 198}_2
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨  b^{5, 198}_1
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨  p_985 ∨ -b^{5, 198}_0
c  in DIMACS:
-9017  9018 -9019  985  9020 0
-9017  9018 -9019  985  9021 0
-9017  9018 -9019  985 -9022 0

c  -2-1 --> break 
c    ( b^{5, 197}_2 ∧  b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧ -p_985) -> break
c  in CNF:
c    -b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨  b^{5, 197}_0 ∨  p_985 ∨ break
c  in DIMACS:
-9017 -9018  9019  985 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 197}_2 ∧ -b^{5, 197}_1 ∧ -b^{5, 197}_0 ∧ true) 
c  in CNF:
c    -b^{5, 197}_2 ∨  b^{5, 197}_1 ∨  b^{5, 197}_0 ∨ false 
c  in DIMACS:
-9017  9018  9019  0

c  3 does not represent an automaton state.
c    -(-b^{5, 197}_2 ∧  b^{5, 197}_1 ∧  b^{5, 197}_0 ∧ true) 
c  in CNF:
c     b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ false 
c  in DIMACS:
 9017 -9018 -9019  0
c  -3 does not represent an automaton state.
c    -( b^{5, 197}_2 ∧  b^{5, 197}_1 ∧  b^{5, 197}_0 ∧ true) 
c  in CNF:
c    -b^{5, 197}_2 ∨ -b^{5, 197}_1 ∨ -b^{5, 197}_0 ∨ false 
c  in DIMACS:
-9017 -9018 -9019  0

c i = 198
c  -2+1 --> -1
c    ( b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧  p_990) -> ( b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0)
c  in CNF:
c    -b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨  b^{5, 199}_2
c    -b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_1
c    -b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨  b^{5, 199}_0
c  in DIMACS:
-9020 -9021  9022 -990  9023 0
-9020 -9021  9022 -990 -9024 0
-9020 -9021  9022 -990  9025 0

c  -1+1 --> 0
c    ( b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0 ∧  p_990) -> (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧ -b^{5, 199}_0)
c  in CNF:
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_2
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_1
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_0
c  in DIMACS:
-9020  9021 -9022 -990 -9023 0
-9020  9021 -9022 -990 -9024 0
-9020  9021 -9022 -990 -9025 0

c  0+1 --> 1
c    (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧  p_990) -> (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0)
c  in CNF:
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_2
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_1
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨  b^{5, 199}_0
c  in DIMACS:
 9020  9021  9022 -990 -9023 0
 9020  9021  9022 -990 -9024 0
 9020  9021  9022 -990  9025 0

c  1+1 --> 2
c    (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0 ∧  p_990) -> (-b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0)
c  in CNF:
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_2
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨  b^{5, 199}_1
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ -p_990 ∨ -b^{5, 199}_0
c  in DIMACS:
 9020  9021 -9022 -990 -9023 0
 9020  9021 -9022 -990  9024 0
 9020  9021 -9022 -990 -9025 0

c  2+1 --> break 
c    (-b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧  p_990) -> break
c  in CNF:
c     b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 9020 -9021  9022 -990 1162 0


c  2-1 --> 1
c    (-b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧ -p_990) -> (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0)
c  in CNF:
c     b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_2
c     b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_1
c     b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨  b^{5, 199}_0
c  in DIMACS:
 9020 -9021  9022  990 -9023 0
 9020 -9021  9022  990 -9024 0
 9020 -9021  9022  990  9025 0

c  1-1 --> 0
c    (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0 ∧ -p_990) -> (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧ -b^{5, 199}_0)
c  in CNF:
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_2
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_1
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_0
c  in DIMACS:
 9020  9021 -9022  990 -9023 0
 9020  9021 -9022  990 -9024 0
 9020  9021 -9022  990 -9025 0

c  0-1 --> -1
c    (-b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧ -p_990) -> ( b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0)
c  in CNF:
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨  b^{5, 199}_2
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_1
c     b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨  b^{5, 199}_0
c  in DIMACS:
 9020  9021  9022  990  9023 0
 9020  9021  9022  990 -9024 0
 9020  9021  9022  990  9025 0

c  -1-1 --> -2
c    ( b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧  b^{5, 198}_0 ∧ -p_990) -> ( b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0)
c  in CNF:
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨  b^{5, 199}_2
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨  b^{5, 199}_1
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨  p_990 ∨ -b^{5, 199}_0
c  in DIMACS:
-9020  9021 -9022  990  9023 0
-9020  9021 -9022  990  9024 0
-9020  9021 -9022  990 -9025 0

c  -2-1 --> break 
c    ( b^{5, 198}_2 ∧  b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨  b^{5, 198}_0 ∨  p_990 ∨ break
c  in DIMACS:
-9020 -9021  9022  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 198}_2 ∧ -b^{5, 198}_1 ∧ -b^{5, 198}_0 ∧ true) 
c  in CNF:
c    -b^{5, 198}_2 ∨  b^{5, 198}_1 ∨  b^{5, 198}_0 ∨ false 
c  in DIMACS:
-9020  9021  9022  0

c  3 does not represent an automaton state.
c    -(-b^{5, 198}_2 ∧  b^{5, 198}_1 ∧  b^{5, 198}_0 ∧ true) 
c  in CNF:
c     b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ false 
c  in DIMACS:
 9020 -9021 -9022  0
c  -3 does not represent an automaton state.
c    -( b^{5, 198}_2 ∧  b^{5, 198}_1 ∧  b^{5, 198}_0 ∧ true) 
c  in CNF:
c    -b^{5, 198}_2 ∨ -b^{5, 198}_1 ∨ -b^{5, 198}_0 ∨ false 
c  in DIMACS:
-9020 -9021 -9022  0

c i = 199
c  -2+1 --> -1
c    ( b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧  p_995) -> ( b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0)
c  in CNF:
c    -b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨  b^{5, 200}_2
c    -b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_1
c    -b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨  b^{5, 200}_0
c  in DIMACS:
-9023 -9024  9025 -995  9026 0
-9023 -9024  9025 -995 -9027 0
-9023 -9024  9025 -995  9028 0

c  -1+1 --> 0
c    ( b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0 ∧  p_995) -> (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧ -b^{5, 200}_0)
c  in CNF:
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_2
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_1
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_0
c  in DIMACS:
-9023  9024 -9025 -995 -9026 0
-9023  9024 -9025 -995 -9027 0
-9023  9024 -9025 -995 -9028 0

c  0+1 --> 1
c    (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧  p_995) -> (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0)
c  in CNF:
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_2
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_1
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨  b^{5, 200}_0
c  in DIMACS:
 9023  9024  9025 -995 -9026 0
 9023  9024  9025 -995 -9027 0
 9023  9024  9025 -995  9028 0

c  1+1 --> 2
c    (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0 ∧  p_995) -> (-b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0)
c  in CNF:
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_2
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨  b^{5, 200}_1
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ -p_995 ∨ -b^{5, 200}_0
c  in DIMACS:
 9023  9024 -9025 -995 -9026 0
 9023  9024 -9025 -995  9027 0
 9023  9024 -9025 -995 -9028 0

c  2+1 --> break 
c    (-b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧  p_995) -> break
c  in CNF:
c     b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ -p_995 ∨ break
c  in DIMACS:
 9023 -9024  9025 -995 1162 0


c  2-1 --> 1
c    (-b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧ -p_995) -> (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0)
c  in CNF:
c     b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_2
c     b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_1
c     b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨  b^{5, 200}_0
c  in DIMACS:
 9023 -9024  9025  995 -9026 0
 9023 -9024  9025  995 -9027 0
 9023 -9024  9025  995  9028 0

c  1-1 --> 0
c    (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0 ∧ -p_995) -> (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧ -b^{5, 200}_0)
c  in CNF:
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_2
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_1
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_0
c  in DIMACS:
 9023  9024 -9025  995 -9026 0
 9023  9024 -9025  995 -9027 0
 9023  9024 -9025  995 -9028 0

c  0-1 --> -1
c    (-b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧ -p_995) -> ( b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0)
c  in CNF:
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨  b^{5, 200}_2
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_1
c     b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨  b^{5, 200}_0
c  in DIMACS:
 9023  9024  9025  995  9026 0
 9023  9024  9025  995 -9027 0
 9023  9024  9025  995  9028 0

c  -1-1 --> -2
c    ( b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧  b^{5, 199}_0 ∧ -p_995) -> ( b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0)
c  in CNF:
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨  b^{5, 200}_2
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨  b^{5, 200}_1
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨  p_995 ∨ -b^{5, 200}_0
c  in DIMACS:
-9023  9024 -9025  995  9026 0
-9023  9024 -9025  995  9027 0
-9023  9024 -9025  995 -9028 0

c  -2-1 --> break 
c    ( b^{5, 199}_2 ∧  b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧ -p_995) -> break
c  in CNF:
c    -b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨  b^{5, 199}_0 ∨  p_995 ∨ break
c  in DIMACS:
-9023 -9024  9025  995 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 199}_2 ∧ -b^{5, 199}_1 ∧ -b^{5, 199}_0 ∧ true) 
c  in CNF:
c    -b^{5, 199}_2 ∨  b^{5, 199}_1 ∨  b^{5, 199}_0 ∨ false 
c  in DIMACS:
-9023  9024  9025  0

c  3 does not represent an automaton state.
c    -(-b^{5, 199}_2 ∧  b^{5, 199}_1 ∧  b^{5, 199}_0 ∧ true) 
c  in CNF:
c     b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ false 
c  in DIMACS:
 9023 -9024 -9025  0
c  -3 does not represent an automaton state.
c    -( b^{5, 199}_2 ∧  b^{5, 199}_1 ∧  b^{5, 199}_0 ∧ true) 
c  in CNF:
c    -b^{5, 199}_2 ∨ -b^{5, 199}_1 ∨ -b^{5, 199}_0 ∨ false 
c  in DIMACS:
-9023 -9024 -9025  0

c i = 200
c  -2+1 --> -1
c    ( b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧  p_1000) -> ( b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0)
c  in CNF:
c    -b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨  b^{5, 201}_2
c    -b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_1
c    -b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨  b^{5, 201}_0
c  in DIMACS:
-9026 -9027  9028 -1000  9029 0
-9026 -9027  9028 -1000 -9030 0
-9026 -9027  9028 -1000  9031 0

c  -1+1 --> 0
c    ( b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0 ∧  p_1000) -> (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧ -b^{5, 201}_0)
c  in CNF:
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_2
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_1
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_0
c  in DIMACS:
-9026  9027 -9028 -1000 -9029 0
-9026  9027 -9028 -1000 -9030 0
-9026  9027 -9028 -1000 -9031 0

c  0+1 --> 1
c    (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧  p_1000) -> (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0)
c  in CNF:
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_2
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_1
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨  b^{5, 201}_0
c  in DIMACS:
 9026  9027  9028 -1000 -9029 0
 9026  9027  9028 -1000 -9030 0
 9026  9027  9028 -1000  9031 0

c  1+1 --> 2
c    (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0 ∧  p_1000) -> (-b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0)
c  in CNF:
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_2
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨  b^{5, 201}_1
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ -p_1000 ∨ -b^{5, 201}_0
c  in DIMACS:
 9026  9027 -9028 -1000 -9029 0
 9026  9027 -9028 -1000  9030 0
 9026  9027 -9028 -1000 -9031 0

c  2+1 --> break 
c    (-b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 9026 -9027  9028 -1000 1162 0


c  2-1 --> 1
c    (-b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧ -p_1000) -> (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0)
c  in CNF:
c     b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_2
c     b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_1
c     b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨  b^{5, 201}_0
c  in DIMACS:
 9026 -9027  9028  1000 -9029 0
 9026 -9027  9028  1000 -9030 0
 9026 -9027  9028  1000  9031 0

c  1-1 --> 0
c    (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0 ∧ -p_1000) -> (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧ -b^{5, 201}_0)
c  in CNF:
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_2
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_1
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_0
c  in DIMACS:
 9026  9027 -9028  1000 -9029 0
 9026  9027 -9028  1000 -9030 0
 9026  9027 -9028  1000 -9031 0

c  0-1 --> -1
c    (-b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧ -p_1000) -> ( b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0)
c  in CNF:
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨  b^{5, 201}_2
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_1
c     b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨  b^{5, 201}_0
c  in DIMACS:
 9026  9027  9028  1000  9029 0
 9026  9027  9028  1000 -9030 0
 9026  9027  9028  1000  9031 0

c  -1-1 --> -2
c    ( b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧  b^{5, 200}_0 ∧ -p_1000) -> ( b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0)
c  in CNF:
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨  b^{5, 201}_2
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨  b^{5, 201}_1
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨  p_1000 ∨ -b^{5, 201}_0
c  in DIMACS:
-9026  9027 -9028  1000  9029 0
-9026  9027 -9028  1000  9030 0
-9026  9027 -9028  1000 -9031 0

c  -2-1 --> break 
c    ( b^{5, 200}_2 ∧  b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨  b^{5, 200}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-9026 -9027  9028  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 200}_2 ∧ -b^{5, 200}_1 ∧ -b^{5, 200}_0 ∧ true) 
c  in CNF:
c    -b^{5, 200}_2 ∨  b^{5, 200}_1 ∨  b^{5, 200}_0 ∨ false 
c  in DIMACS:
-9026  9027  9028  0

c  3 does not represent an automaton state.
c    -(-b^{5, 200}_2 ∧  b^{5, 200}_1 ∧  b^{5, 200}_0 ∧ true) 
c  in CNF:
c     b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ false 
c  in DIMACS:
 9026 -9027 -9028  0
c  -3 does not represent an automaton state.
c    -( b^{5, 200}_2 ∧  b^{5, 200}_1 ∧  b^{5, 200}_0 ∧ true) 
c  in CNF:
c    -b^{5, 200}_2 ∨ -b^{5, 200}_1 ∨ -b^{5, 200}_0 ∨ false 
c  in DIMACS:
-9026 -9027 -9028  0

c i = 201
c  -2+1 --> -1
c    ( b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧  p_1005) -> ( b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0)
c  in CNF:
c    -b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨  b^{5, 202}_2
c    -b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_1
c    -b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨  b^{5, 202}_0
c  in DIMACS:
-9029 -9030  9031 -1005  9032 0
-9029 -9030  9031 -1005 -9033 0
-9029 -9030  9031 -1005  9034 0

c  -1+1 --> 0
c    ( b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0 ∧  p_1005) -> (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧ -b^{5, 202}_0)
c  in CNF:
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_2
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_1
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_0
c  in DIMACS:
-9029  9030 -9031 -1005 -9032 0
-9029  9030 -9031 -1005 -9033 0
-9029  9030 -9031 -1005 -9034 0

c  0+1 --> 1
c    (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧  p_1005) -> (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0)
c  in CNF:
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_2
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_1
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨  b^{5, 202}_0
c  in DIMACS:
 9029  9030  9031 -1005 -9032 0
 9029  9030  9031 -1005 -9033 0
 9029  9030  9031 -1005  9034 0

c  1+1 --> 2
c    (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0 ∧  p_1005) -> (-b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0)
c  in CNF:
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_2
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨  b^{5, 202}_1
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ -p_1005 ∨ -b^{5, 202}_0
c  in DIMACS:
 9029  9030 -9031 -1005 -9032 0
 9029  9030 -9031 -1005  9033 0
 9029  9030 -9031 -1005 -9034 0

c  2+1 --> break 
c    (-b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 9029 -9030  9031 -1005 1162 0


c  2-1 --> 1
c    (-b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧ -p_1005) -> (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0)
c  in CNF:
c     b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_2
c     b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_1
c     b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨  b^{5, 202}_0
c  in DIMACS:
 9029 -9030  9031  1005 -9032 0
 9029 -9030  9031  1005 -9033 0
 9029 -9030  9031  1005  9034 0

c  1-1 --> 0
c    (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0 ∧ -p_1005) -> (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧ -b^{5, 202}_0)
c  in CNF:
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_2
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_1
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_0
c  in DIMACS:
 9029  9030 -9031  1005 -9032 0
 9029  9030 -9031  1005 -9033 0
 9029  9030 -9031  1005 -9034 0

c  0-1 --> -1
c    (-b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧ -p_1005) -> ( b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0)
c  in CNF:
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨  b^{5, 202}_2
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_1
c     b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨  b^{5, 202}_0
c  in DIMACS:
 9029  9030  9031  1005  9032 0
 9029  9030  9031  1005 -9033 0
 9029  9030  9031  1005  9034 0

c  -1-1 --> -2
c    ( b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧  b^{5, 201}_0 ∧ -p_1005) -> ( b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0)
c  in CNF:
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨  b^{5, 202}_2
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨  b^{5, 202}_1
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨  p_1005 ∨ -b^{5, 202}_0
c  in DIMACS:
-9029  9030 -9031  1005  9032 0
-9029  9030 -9031  1005  9033 0
-9029  9030 -9031  1005 -9034 0

c  -2-1 --> break 
c    ( b^{5, 201}_2 ∧  b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨  b^{5, 201}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-9029 -9030  9031  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 201}_2 ∧ -b^{5, 201}_1 ∧ -b^{5, 201}_0 ∧ true) 
c  in CNF:
c    -b^{5, 201}_2 ∨  b^{5, 201}_1 ∨  b^{5, 201}_0 ∨ false 
c  in DIMACS:
-9029  9030  9031  0

c  3 does not represent an automaton state.
c    -(-b^{5, 201}_2 ∧  b^{5, 201}_1 ∧  b^{5, 201}_0 ∧ true) 
c  in CNF:
c     b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ false 
c  in DIMACS:
 9029 -9030 -9031  0
c  -3 does not represent an automaton state.
c    -( b^{5, 201}_2 ∧  b^{5, 201}_1 ∧  b^{5, 201}_0 ∧ true) 
c  in CNF:
c    -b^{5, 201}_2 ∨ -b^{5, 201}_1 ∨ -b^{5, 201}_0 ∨ false 
c  in DIMACS:
-9029 -9030 -9031  0

c i = 202
c  -2+1 --> -1
c    ( b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧  p_1010) -> ( b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0)
c  in CNF:
c    -b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨  b^{5, 203}_2
c    -b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_1
c    -b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨  b^{5, 203}_0
c  in DIMACS:
-9032 -9033  9034 -1010  9035 0
-9032 -9033  9034 -1010 -9036 0
-9032 -9033  9034 -1010  9037 0

c  -1+1 --> 0
c    ( b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0 ∧  p_1010) -> (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧ -b^{5, 203}_0)
c  in CNF:
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_2
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_1
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_0
c  in DIMACS:
-9032  9033 -9034 -1010 -9035 0
-9032  9033 -9034 -1010 -9036 0
-9032  9033 -9034 -1010 -9037 0

c  0+1 --> 1
c    (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧  p_1010) -> (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0)
c  in CNF:
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_2
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_1
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨  b^{5, 203}_0
c  in DIMACS:
 9032  9033  9034 -1010 -9035 0
 9032  9033  9034 -1010 -9036 0
 9032  9033  9034 -1010  9037 0

c  1+1 --> 2
c    (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0 ∧  p_1010) -> (-b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0)
c  in CNF:
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_2
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨  b^{5, 203}_1
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ -p_1010 ∨ -b^{5, 203}_0
c  in DIMACS:
 9032  9033 -9034 -1010 -9035 0
 9032  9033 -9034 -1010  9036 0
 9032  9033 -9034 -1010 -9037 0

c  2+1 --> break 
c    (-b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 9032 -9033  9034 -1010 1162 0


c  2-1 --> 1
c    (-b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧ -p_1010) -> (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0)
c  in CNF:
c     b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_2
c     b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_1
c     b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨  b^{5, 203}_0
c  in DIMACS:
 9032 -9033  9034  1010 -9035 0
 9032 -9033  9034  1010 -9036 0
 9032 -9033  9034  1010  9037 0

c  1-1 --> 0
c    (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0 ∧ -p_1010) -> (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧ -b^{5, 203}_0)
c  in CNF:
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_2
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_1
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_0
c  in DIMACS:
 9032  9033 -9034  1010 -9035 0
 9032  9033 -9034  1010 -9036 0
 9032  9033 -9034  1010 -9037 0

c  0-1 --> -1
c    (-b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧ -p_1010) -> ( b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0)
c  in CNF:
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨  b^{5, 203}_2
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_1
c     b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨  b^{5, 203}_0
c  in DIMACS:
 9032  9033  9034  1010  9035 0
 9032  9033  9034  1010 -9036 0
 9032  9033  9034  1010  9037 0

c  -1-1 --> -2
c    ( b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧  b^{5, 202}_0 ∧ -p_1010) -> ( b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0)
c  in CNF:
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨  b^{5, 203}_2
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨  b^{5, 203}_1
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨  p_1010 ∨ -b^{5, 203}_0
c  in DIMACS:
-9032  9033 -9034  1010  9035 0
-9032  9033 -9034  1010  9036 0
-9032  9033 -9034  1010 -9037 0

c  -2-1 --> break 
c    ( b^{5, 202}_2 ∧  b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨  b^{5, 202}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-9032 -9033  9034  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 202}_2 ∧ -b^{5, 202}_1 ∧ -b^{5, 202}_0 ∧ true) 
c  in CNF:
c    -b^{5, 202}_2 ∨  b^{5, 202}_1 ∨  b^{5, 202}_0 ∨ false 
c  in DIMACS:
-9032  9033  9034  0

c  3 does not represent an automaton state.
c    -(-b^{5, 202}_2 ∧  b^{5, 202}_1 ∧  b^{5, 202}_0 ∧ true) 
c  in CNF:
c     b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ false 
c  in DIMACS:
 9032 -9033 -9034  0
c  -3 does not represent an automaton state.
c    -( b^{5, 202}_2 ∧  b^{5, 202}_1 ∧  b^{5, 202}_0 ∧ true) 
c  in CNF:
c    -b^{5, 202}_2 ∨ -b^{5, 202}_1 ∨ -b^{5, 202}_0 ∨ false 
c  in DIMACS:
-9032 -9033 -9034  0

c i = 203
c  -2+1 --> -1
c    ( b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧  p_1015) -> ( b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0)
c  in CNF:
c    -b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨  b^{5, 204}_2
c    -b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_1
c    -b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨  b^{5, 204}_0
c  in DIMACS:
-9035 -9036  9037 -1015  9038 0
-9035 -9036  9037 -1015 -9039 0
-9035 -9036  9037 -1015  9040 0

c  -1+1 --> 0
c    ( b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0 ∧  p_1015) -> (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧ -b^{5, 204}_0)
c  in CNF:
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_2
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_1
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_0
c  in DIMACS:
-9035  9036 -9037 -1015 -9038 0
-9035  9036 -9037 -1015 -9039 0
-9035  9036 -9037 -1015 -9040 0

c  0+1 --> 1
c    (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧  p_1015) -> (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0)
c  in CNF:
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_2
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_1
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨  b^{5, 204}_0
c  in DIMACS:
 9035  9036  9037 -1015 -9038 0
 9035  9036  9037 -1015 -9039 0
 9035  9036  9037 -1015  9040 0

c  1+1 --> 2
c    (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0 ∧  p_1015) -> (-b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0)
c  in CNF:
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_2
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨  b^{5, 204}_1
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ -p_1015 ∨ -b^{5, 204}_0
c  in DIMACS:
 9035  9036 -9037 -1015 -9038 0
 9035  9036 -9037 -1015  9039 0
 9035  9036 -9037 -1015 -9040 0

c  2+1 --> break 
c    (-b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 9035 -9036  9037 -1015 1162 0


c  2-1 --> 1
c    (-b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧ -p_1015) -> (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0)
c  in CNF:
c     b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_2
c     b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_1
c     b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨  b^{5, 204}_0
c  in DIMACS:
 9035 -9036  9037  1015 -9038 0
 9035 -9036  9037  1015 -9039 0
 9035 -9036  9037  1015  9040 0

c  1-1 --> 0
c    (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0 ∧ -p_1015) -> (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧ -b^{5, 204}_0)
c  in CNF:
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_2
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_1
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_0
c  in DIMACS:
 9035  9036 -9037  1015 -9038 0
 9035  9036 -9037  1015 -9039 0
 9035  9036 -9037  1015 -9040 0

c  0-1 --> -1
c    (-b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧ -p_1015) -> ( b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0)
c  in CNF:
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨  b^{5, 204}_2
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_1
c     b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨  b^{5, 204}_0
c  in DIMACS:
 9035  9036  9037  1015  9038 0
 9035  9036  9037  1015 -9039 0
 9035  9036  9037  1015  9040 0

c  -1-1 --> -2
c    ( b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧  b^{5, 203}_0 ∧ -p_1015) -> ( b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0)
c  in CNF:
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨  b^{5, 204}_2
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨  b^{5, 204}_1
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨  p_1015 ∨ -b^{5, 204}_0
c  in DIMACS:
-9035  9036 -9037  1015  9038 0
-9035  9036 -9037  1015  9039 0
-9035  9036 -9037  1015 -9040 0

c  -2-1 --> break 
c    ( b^{5, 203}_2 ∧  b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨  b^{5, 203}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-9035 -9036  9037  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 203}_2 ∧ -b^{5, 203}_1 ∧ -b^{5, 203}_0 ∧ true) 
c  in CNF:
c    -b^{5, 203}_2 ∨  b^{5, 203}_1 ∨  b^{5, 203}_0 ∨ false 
c  in DIMACS:
-9035  9036  9037  0

c  3 does not represent an automaton state.
c    -(-b^{5, 203}_2 ∧  b^{5, 203}_1 ∧  b^{5, 203}_0 ∧ true) 
c  in CNF:
c     b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ false 
c  in DIMACS:
 9035 -9036 -9037  0
c  -3 does not represent an automaton state.
c    -( b^{5, 203}_2 ∧  b^{5, 203}_1 ∧  b^{5, 203}_0 ∧ true) 
c  in CNF:
c    -b^{5, 203}_2 ∨ -b^{5, 203}_1 ∨ -b^{5, 203}_0 ∨ false 
c  in DIMACS:
-9035 -9036 -9037  0

c i = 204
c  -2+1 --> -1
c    ( b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧  p_1020) -> ( b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0)
c  in CNF:
c    -b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨  b^{5, 205}_2
c    -b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_1
c    -b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨  b^{5, 205}_0
c  in DIMACS:
-9038 -9039  9040 -1020  9041 0
-9038 -9039  9040 -1020 -9042 0
-9038 -9039  9040 -1020  9043 0

c  -1+1 --> 0
c    ( b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0 ∧  p_1020) -> (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧ -b^{5, 205}_0)
c  in CNF:
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_2
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_1
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_0
c  in DIMACS:
-9038  9039 -9040 -1020 -9041 0
-9038  9039 -9040 -1020 -9042 0
-9038  9039 -9040 -1020 -9043 0

c  0+1 --> 1
c    (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧  p_1020) -> (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0)
c  in CNF:
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_2
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_1
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨  b^{5, 205}_0
c  in DIMACS:
 9038  9039  9040 -1020 -9041 0
 9038  9039  9040 -1020 -9042 0
 9038  9039  9040 -1020  9043 0

c  1+1 --> 2
c    (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0 ∧  p_1020) -> (-b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0)
c  in CNF:
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_2
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨  b^{5, 205}_1
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ -p_1020 ∨ -b^{5, 205}_0
c  in DIMACS:
 9038  9039 -9040 -1020 -9041 0
 9038  9039 -9040 -1020  9042 0
 9038  9039 -9040 -1020 -9043 0

c  2+1 --> break 
c    (-b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 9038 -9039  9040 -1020 1162 0


c  2-1 --> 1
c    (-b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧ -p_1020) -> (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0)
c  in CNF:
c     b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_2
c     b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_1
c     b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨  b^{5, 205}_0
c  in DIMACS:
 9038 -9039  9040  1020 -9041 0
 9038 -9039  9040  1020 -9042 0
 9038 -9039  9040  1020  9043 0

c  1-1 --> 0
c    (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0 ∧ -p_1020) -> (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧ -b^{5, 205}_0)
c  in CNF:
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_2
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_1
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_0
c  in DIMACS:
 9038  9039 -9040  1020 -9041 0
 9038  9039 -9040  1020 -9042 0
 9038  9039 -9040  1020 -9043 0

c  0-1 --> -1
c    (-b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧ -p_1020) -> ( b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0)
c  in CNF:
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨  b^{5, 205}_2
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_1
c     b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨  b^{5, 205}_0
c  in DIMACS:
 9038  9039  9040  1020  9041 0
 9038  9039  9040  1020 -9042 0
 9038  9039  9040  1020  9043 0

c  -1-1 --> -2
c    ( b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧  b^{5, 204}_0 ∧ -p_1020) -> ( b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0)
c  in CNF:
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨  b^{5, 205}_2
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨  b^{5, 205}_1
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨  p_1020 ∨ -b^{5, 205}_0
c  in DIMACS:
-9038  9039 -9040  1020  9041 0
-9038  9039 -9040  1020  9042 0
-9038  9039 -9040  1020 -9043 0

c  -2-1 --> break 
c    ( b^{5, 204}_2 ∧  b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨  b^{5, 204}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-9038 -9039  9040  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 204}_2 ∧ -b^{5, 204}_1 ∧ -b^{5, 204}_0 ∧ true) 
c  in CNF:
c    -b^{5, 204}_2 ∨  b^{5, 204}_1 ∨  b^{5, 204}_0 ∨ false 
c  in DIMACS:
-9038  9039  9040  0

c  3 does not represent an automaton state.
c    -(-b^{5, 204}_2 ∧  b^{5, 204}_1 ∧  b^{5, 204}_0 ∧ true) 
c  in CNF:
c     b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ false 
c  in DIMACS:
 9038 -9039 -9040  0
c  -3 does not represent an automaton state.
c    -( b^{5, 204}_2 ∧  b^{5, 204}_1 ∧  b^{5, 204}_0 ∧ true) 
c  in CNF:
c    -b^{5, 204}_2 ∨ -b^{5, 204}_1 ∨ -b^{5, 204}_0 ∨ false 
c  in DIMACS:
-9038 -9039 -9040  0

c i = 205
c  -2+1 --> -1
c    ( b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧  p_1025) -> ( b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0)
c  in CNF:
c    -b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨  b^{5, 206}_2
c    -b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_1
c    -b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨  b^{5, 206}_0
c  in DIMACS:
-9041 -9042  9043 -1025  9044 0
-9041 -9042  9043 -1025 -9045 0
-9041 -9042  9043 -1025  9046 0

c  -1+1 --> 0
c    ( b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0 ∧  p_1025) -> (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧ -b^{5, 206}_0)
c  in CNF:
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_2
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_1
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_0
c  in DIMACS:
-9041  9042 -9043 -1025 -9044 0
-9041  9042 -9043 -1025 -9045 0
-9041  9042 -9043 -1025 -9046 0

c  0+1 --> 1
c    (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧  p_1025) -> (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0)
c  in CNF:
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_2
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_1
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨  b^{5, 206}_0
c  in DIMACS:
 9041  9042  9043 -1025 -9044 0
 9041  9042  9043 -1025 -9045 0
 9041  9042  9043 -1025  9046 0

c  1+1 --> 2
c    (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0 ∧  p_1025) -> (-b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0)
c  in CNF:
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_2
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨  b^{5, 206}_1
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ -p_1025 ∨ -b^{5, 206}_0
c  in DIMACS:
 9041  9042 -9043 -1025 -9044 0
 9041  9042 -9043 -1025  9045 0
 9041  9042 -9043 -1025 -9046 0

c  2+1 --> break 
c    (-b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧  p_1025) -> break
c  in CNF:
c     b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ -p_1025 ∨ break
c  in DIMACS:
 9041 -9042  9043 -1025 1162 0


c  2-1 --> 1
c    (-b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧ -p_1025) -> (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0)
c  in CNF:
c     b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_2
c     b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_1
c     b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨  b^{5, 206}_0
c  in DIMACS:
 9041 -9042  9043  1025 -9044 0
 9041 -9042  9043  1025 -9045 0
 9041 -9042  9043  1025  9046 0

c  1-1 --> 0
c    (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0 ∧ -p_1025) -> (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧ -b^{5, 206}_0)
c  in CNF:
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_2
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_1
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_0
c  in DIMACS:
 9041  9042 -9043  1025 -9044 0
 9041  9042 -9043  1025 -9045 0
 9041  9042 -9043  1025 -9046 0

c  0-1 --> -1
c    (-b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧ -p_1025) -> ( b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0)
c  in CNF:
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨  b^{5, 206}_2
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_1
c     b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨  b^{5, 206}_0
c  in DIMACS:
 9041  9042  9043  1025  9044 0
 9041  9042  9043  1025 -9045 0
 9041  9042  9043  1025  9046 0

c  -1-1 --> -2
c    ( b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧  b^{5, 205}_0 ∧ -p_1025) -> ( b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0)
c  in CNF:
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨  b^{5, 206}_2
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨  b^{5, 206}_1
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨  p_1025 ∨ -b^{5, 206}_0
c  in DIMACS:
-9041  9042 -9043  1025  9044 0
-9041  9042 -9043  1025  9045 0
-9041  9042 -9043  1025 -9046 0

c  -2-1 --> break 
c    ( b^{5, 205}_2 ∧  b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧ -p_1025) -> break
c  in CNF:
c    -b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨  b^{5, 205}_0 ∨  p_1025 ∨ break
c  in DIMACS:
-9041 -9042  9043  1025 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 205}_2 ∧ -b^{5, 205}_1 ∧ -b^{5, 205}_0 ∧ true) 
c  in CNF:
c    -b^{5, 205}_2 ∨  b^{5, 205}_1 ∨  b^{5, 205}_0 ∨ false 
c  in DIMACS:
-9041  9042  9043  0

c  3 does not represent an automaton state.
c    -(-b^{5, 205}_2 ∧  b^{5, 205}_1 ∧  b^{5, 205}_0 ∧ true) 
c  in CNF:
c     b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ false 
c  in DIMACS:
 9041 -9042 -9043  0
c  -3 does not represent an automaton state.
c    -( b^{5, 205}_2 ∧  b^{5, 205}_1 ∧  b^{5, 205}_0 ∧ true) 
c  in CNF:
c    -b^{5, 205}_2 ∨ -b^{5, 205}_1 ∨ -b^{5, 205}_0 ∨ false 
c  in DIMACS:
-9041 -9042 -9043  0

c i = 206
c  -2+1 --> -1
c    ( b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧  p_1030) -> ( b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0)
c  in CNF:
c    -b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨  b^{5, 207}_2
c    -b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_1
c    -b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨  b^{5, 207}_0
c  in DIMACS:
-9044 -9045  9046 -1030  9047 0
-9044 -9045  9046 -1030 -9048 0
-9044 -9045  9046 -1030  9049 0

c  -1+1 --> 0
c    ( b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0 ∧  p_1030) -> (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧ -b^{5, 207}_0)
c  in CNF:
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_2
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_1
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_0
c  in DIMACS:
-9044  9045 -9046 -1030 -9047 0
-9044  9045 -9046 -1030 -9048 0
-9044  9045 -9046 -1030 -9049 0

c  0+1 --> 1
c    (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧  p_1030) -> (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0)
c  in CNF:
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_2
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_1
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨  b^{5, 207}_0
c  in DIMACS:
 9044  9045  9046 -1030 -9047 0
 9044  9045  9046 -1030 -9048 0
 9044  9045  9046 -1030  9049 0

c  1+1 --> 2
c    (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0 ∧  p_1030) -> (-b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0)
c  in CNF:
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_2
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨  b^{5, 207}_1
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ -p_1030 ∨ -b^{5, 207}_0
c  in DIMACS:
 9044  9045 -9046 -1030 -9047 0
 9044  9045 -9046 -1030  9048 0
 9044  9045 -9046 -1030 -9049 0

c  2+1 --> break 
c    (-b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 9044 -9045  9046 -1030 1162 0


c  2-1 --> 1
c    (-b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧ -p_1030) -> (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0)
c  in CNF:
c     b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_2
c     b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_1
c     b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨  b^{5, 207}_0
c  in DIMACS:
 9044 -9045  9046  1030 -9047 0
 9044 -9045  9046  1030 -9048 0
 9044 -9045  9046  1030  9049 0

c  1-1 --> 0
c    (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0 ∧ -p_1030) -> (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧ -b^{5, 207}_0)
c  in CNF:
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_2
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_1
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_0
c  in DIMACS:
 9044  9045 -9046  1030 -9047 0
 9044  9045 -9046  1030 -9048 0
 9044  9045 -9046  1030 -9049 0

c  0-1 --> -1
c    (-b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧ -p_1030) -> ( b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0)
c  in CNF:
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨  b^{5, 207}_2
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_1
c     b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨  b^{5, 207}_0
c  in DIMACS:
 9044  9045  9046  1030  9047 0
 9044  9045  9046  1030 -9048 0
 9044  9045  9046  1030  9049 0

c  -1-1 --> -2
c    ( b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧  b^{5, 206}_0 ∧ -p_1030) -> ( b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0)
c  in CNF:
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨  b^{5, 207}_2
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨  b^{5, 207}_1
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨  p_1030 ∨ -b^{5, 207}_0
c  in DIMACS:
-9044  9045 -9046  1030  9047 0
-9044  9045 -9046  1030  9048 0
-9044  9045 -9046  1030 -9049 0

c  -2-1 --> break 
c    ( b^{5, 206}_2 ∧  b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨  b^{5, 206}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-9044 -9045  9046  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 206}_2 ∧ -b^{5, 206}_1 ∧ -b^{5, 206}_0 ∧ true) 
c  in CNF:
c    -b^{5, 206}_2 ∨  b^{5, 206}_1 ∨  b^{5, 206}_0 ∨ false 
c  in DIMACS:
-9044  9045  9046  0

c  3 does not represent an automaton state.
c    -(-b^{5, 206}_2 ∧  b^{5, 206}_1 ∧  b^{5, 206}_0 ∧ true) 
c  in CNF:
c     b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ false 
c  in DIMACS:
 9044 -9045 -9046  0
c  -3 does not represent an automaton state.
c    -( b^{5, 206}_2 ∧  b^{5, 206}_1 ∧  b^{5, 206}_0 ∧ true) 
c  in CNF:
c    -b^{5, 206}_2 ∨ -b^{5, 206}_1 ∨ -b^{5, 206}_0 ∨ false 
c  in DIMACS:
-9044 -9045 -9046  0

c i = 207
c  -2+1 --> -1
c    ( b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧  p_1035) -> ( b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0)
c  in CNF:
c    -b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨  b^{5, 208}_2
c    -b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_1
c    -b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨  b^{5, 208}_0
c  in DIMACS:
-9047 -9048  9049 -1035  9050 0
-9047 -9048  9049 -1035 -9051 0
-9047 -9048  9049 -1035  9052 0

c  -1+1 --> 0
c    ( b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0 ∧  p_1035) -> (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧ -b^{5, 208}_0)
c  in CNF:
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_2
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_1
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_0
c  in DIMACS:
-9047  9048 -9049 -1035 -9050 0
-9047  9048 -9049 -1035 -9051 0
-9047  9048 -9049 -1035 -9052 0

c  0+1 --> 1
c    (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧  p_1035) -> (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0)
c  in CNF:
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_2
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_1
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨  b^{5, 208}_0
c  in DIMACS:
 9047  9048  9049 -1035 -9050 0
 9047  9048  9049 -1035 -9051 0
 9047  9048  9049 -1035  9052 0

c  1+1 --> 2
c    (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0 ∧  p_1035) -> (-b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0)
c  in CNF:
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_2
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨  b^{5, 208}_1
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ -p_1035 ∨ -b^{5, 208}_0
c  in DIMACS:
 9047  9048 -9049 -1035 -9050 0
 9047  9048 -9049 -1035  9051 0
 9047  9048 -9049 -1035 -9052 0

c  2+1 --> break 
c    (-b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 9047 -9048  9049 -1035 1162 0


c  2-1 --> 1
c    (-b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧ -p_1035) -> (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0)
c  in CNF:
c     b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_2
c     b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_1
c     b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨  b^{5, 208}_0
c  in DIMACS:
 9047 -9048  9049  1035 -9050 0
 9047 -9048  9049  1035 -9051 0
 9047 -9048  9049  1035  9052 0

c  1-1 --> 0
c    (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0 ∧ -p_1035) -> (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧ -b^{5, 208}_0)
c  in CNF:
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_2
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_1
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_0
c  in DIMACS:
 9047  9048 -9049  1035 -9050 0
 9047  9048 -9049  1035 -9051 0
 9047  9048 -9049  1035 -9052 0

c  0-1 --> -1
c    (-b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧ -p_1035) -> ( b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0)
c  in CNF:
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨  b^{5, 208}_2
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_1
c     b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨  b^{5, 208}_0
c  in DIMACS:
 9047  9048  9049  1035  9050 0
 9047  9048  9049  1035 -9051 0
 9047  9048  9049  1035  9052 0

c  -1-1 --> -2
c    ( b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧  b^{5, 207}_0 ∧ -p_1035) -> ( b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0)
c  in CNF:
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨  b^{5, 208}_2
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨  b^{5, 208}_1
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨  p_1035 ∨ -b^{5, 208}_0
c  in DIMACS:
-9047  9048 -9049  1035  9050 0
-9047  9048 -9049  1035  9051 0
-9047  9048 -9049  1035 -9052 0

c  -2-1 --> break 
c    ( b^{5, 207}_2 ∧  b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨  b^{5, 207}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-9047 -9048  9049  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 207}_2 ∧ -b^{5, 207}_1 ∧ -b^{5, 207}_0 ∧ true) 
c  in CNF:
c    -b^{5, 207}_2 ∨  b^{5, 207}_1 ∨  b^{5, 207}_0 ∨ false 
c  in DIMACS:
-9047  9048  9049  0

c  3 does not represent an automaton state.
c    -(-b^{5, 207}_2 ∧  b^{5, 207}_1 ∧  b^{5, 207}_0 ∧ true) 
c  in CNF:
c     b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ false 
c  in DIMACS:
 9047 -9048 -9049  0
c  -3 does not represent an automaton state.
c    -( b^{5, 207}_2 ∧  b^{5, 207}_1 ∧  b^{5, 207}_0 ∧ true) 
c  in CNF:
c    -b^{5, 207}_2 ∨ -b^{5, 207}_1 ∨ -b^{5, 207}_0 ∨ false 
c  in DIMACS:
-9047 -9048 -9049  0

c i = 208
c  -2+1 --> -1
c    ( b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧  p_1040) -> ( b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0)
c  in CNF:
c    -b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨  b^{5, 209}_2
c    -b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_1
c    -b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨  b^{5, 209}_0
c  in DIMACS:
-9050 -9051  9052 -1040  9053 0
-9050 -9051  9052 -1040 -9054 0
-9050 -9051  9052 -1040  9055 0

c  -1+1 --> 0
c    ( b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0 ∧  p_1040) -> (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧ -b^{5, 209}_0)
c  in CNF:
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_2
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_1
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_0
c  in DIMACS:
-9050  9051 -9052 -1040 -9053 0
-9050  9051 -9052 -1040 -9054 0
-9050  9051 -9052 -1040 -9055 0

c  0+1 --> 1
c    (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧  p_1040) -> (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0)
c  in CNF:
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_2
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_1
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨  b^{5, 209}_0
c  in DIMACS:
 9050  9051  9052 -1040 -9053 0
 9050  9051  9052 -1040 -9054 0
 9050  9051  9052 -1040  9055 0

c  1+1 --> 2
c    (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0 ∧  p_1040) -> (-b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0)
c  in CNF:
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_2
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨  b^{5, 209}_1
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ -p_1040 ∨ -b^{5, 209}_0
c  in DIMACS:
 9050  9051 -9052 -1040 -9053 0
 9050  9051 -9052 -1040  9054 0
 9050  9051 -9052 -1040 -9055 0

c  2+1 --> break 
c    (-b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 9050 -9051  9052 -1040 1162 0


c  2-1 --> 1
c    (-b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧ -p_1040) -> (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0)
c  in CNF:
c     b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_2
c     b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_1
c     b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨  b^{5, 209}_0
c  in DIMACS:
 9050 -9051  9052  1040 -9053 0
 9050 -9051  9052  1040 -9054 0
 9050 -9051  9052  1040  9055 0

c  1-1 --> 0
c    (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0 ∧ -p_1040) -> (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧ -b^{5, 209}_0)
c  in CNF:
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_2
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_1
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_0
c  in DIMACS:
 9050  9051 -9052  1040 -9053 0
 9050  9051 -9052  1040 -9054 0
 9050  9051 -9052  1040 -9055 0

c  0-1 --> -1
c    (-b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧ -p_1040) -> ( b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0)
c  in CNF:
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨  b^{5, 209}_2
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_1
c     b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨  b^{5, 209}_0
c  in DIMACS:
 9050  9051  9052  1040  9053 0
 9050  9051  9052  1040 -9054 0
 9050  9051  9052  1040  9055 0

c  -1-1 --> -2
c    ( b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧  b^{5, 208}_0 ∧ -p_1040) -> ( b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0)
c  in CNF:
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨  b^{5, 209}_2
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨  b^{5, 209}_1
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨  p_1040 ∨ -b^{5, 209}_0
c  in DIMACS:
-9050  9051 -9052  1040  9053 0
-9050  9051 -9052  1040  9054 0
-9050  9051 -9052  1040 -9055 0

c  -2-1 --> break 
c    ( b^{5, 208}_2 ∧  b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨  b^{5, 208}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-9050 -9051  9052  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 208}_2 ∧ -b^{5, 208}_1 ∧ -b^{5, 208}_0 ∧ true) 
c  in CNF:
c    -b^{5, 208}_2 ∨  b^{5, 208}_1 ∨  b^{5, 208}_0 ∨ false 
c  in DIMACS:
-9050  9051  9052  0

c  3 does not represent an automaton state.
c    -(-b^{5, 208}_2 ∧  b^{5, 208}_1 ∧  b^{5, 208}_0 ∧ true) 
c  in CNF:
c     b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ false 
c  in DIMACS:
 9050 -9051 -9052  0
c  -3 does not represent an automaton state.
c    -( b^{5, 208}_2 ∧  b^{5, 208}_1 ∧  b^{5, 208}_0 ∧ true) 
c  in CNF:
c    -b^{5, 208}_2 ∨ -b^{5, 208}_1 ∨ -b^{5, 208}_0 ∨ false 
c  in DIMACS:
-9050 -9051 -9052  0

c i = 209
c  -2+1 --> -1
c    ( b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧  p_1045) -> ( b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0)
c  in CNF:
c    -b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨  b^{5, 210}_2
c    -b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_1
c    -b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨  b^{5, 210}_0
c  in DIMACS:
-9053 -9054  9055 -1045  9056 0
-9053 -9054  9055 -1045 -9057 0
-9053 -9054  9055 -1045  9058 0

c  -1+1 --> 0
c    ( b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0 ∧  p_1045) -> (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧ -b^{5, 210}_0)
c  in CNF:
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_2
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_1
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_0
c  in DIMACS:
-9053  9054 -9055 -1045 -9056 0
-9053  9054 -9055 -1045 -9057 0
-9053  9054 -9055 -1045 -9058 0

c  0+1 --> 1
c    (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧  p_1045) -> (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0)
c  in CNF:
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_2
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_1
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨  b^{5, 210}_0
c  in DIMACS:
 9053  9054  9055 -1045 -9056 0
 9053  9054  9055 -1045 -9057 0
 9053  9054  9055 -1045  9058 0

c  1+1 --> 2
c    (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0 ∧  p_1045) -> (-b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0)
c  in CNF:
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_2
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨  b^{5, 210}_1
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ -p_1045 ∨ -b^{5, 210}_0
c  in DIMACS:
 9053  9054 -9055 -1045 -9056 0
 9053  9054 -9055 -1045  9057 0
 9053  9054 -9055 -1045 -9058 0

c  2+1 --> break 
c    (-b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 9053 -9054  9055 -1045 1162 0


c  2-1 --> 1
c    (-b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧ -p_1045) -> (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0)
c  in CNF:
c     b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_2
c     b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_1
c     b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨  b^{5, 210}_0
c  in DIMACS:
 9053 -9054  9055  1045 -9056 0
 9053 -9054  9055  1045 -9057 0
 9053 -9054  9055  1045  9058 0

c  1-1 --> 0
c    (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0 ∧ -p_1045) -> (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧ -b^{5, 210}_0)
c  in CNF:
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_2
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_1
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_0
c  in DIMACS:
 9053  9054 -9055  1045 -9056 0
 9053  9054 -9055  1045 -9057 0
 9053  9054 -9055  1045 -9058 0

c  0-1 --> -1
c    (-b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧ -p_1045) -> ( b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0)
c  in CNF:
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨  b^{5, 210}_2
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_1
c     b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨  b^{5, 210}_0
c  in DIMACS:
 9053  9054  9055  1045  9056 0
 9053  9054  9055  1045 -9057 0
 9053  9054  9055  1045  9058 0

c  -1-1 --> -2
c    ( b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧  b^{5, 209}_0 ∧ -p_1045) -> ( b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0)
c  in CNF:
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨  b^{5, 210}_2
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨  b^{5, 210}_1
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨  p_1045 ∨ -b^{5, 210}_0
c  in DIMACS:
-9053  9054 -9055  1045  9056 0
-9053  9054 -9055  1045  9057 0
-9053  9054 -9055  1045 -9058 0

c  -2-1 --> break 
c    ( b^{5, 209}_2 ∧  b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨  b^{5, 209}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-9053 -9054  9055  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 209}_2 ∧ -b^{5, 209}_1 ∧ -b^{5, 209}_0 ∧ true) 
c  in CNF:
c    -b^{5, 209}_2 ∨  b^{5, 209}_1 ∨  b^{5, 209}_0 ∨ false 
c  in DIMACS:
-9053  9054  9055  0

c  3 does not represent an automaton state.
c    -(-b^{5, 209}_2 ∧  b^{5, 209}_1 ∧  b^{5, 209}_0 ∧ true) 
c  in CNF:
c     b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ false 
c  in DIMACS:
 9053 -9054 -9055  0
c  -3 does not represent an automaton state.
c    -( b^{5, 209}_2 ∧  b^{5, 209}_1 ∧  b^{5, 209}_0 ∧ true) 
c  in CNF:
c    -b^{5, 209}_2 ∨ -b^{5, 209}_1 ∨ -b^{5, 209}_0 ∨ false 
c  in DIMACS:
-9053 -9054 -9055  0

c i = 210
c  -2+1 --> -1
c    ( b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧  p_1050) -> ( b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0)
c  in CNF:
c    -b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨  b^{5, 211}_2
c    -b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_1
c    -b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨  b^{5, 211}_0
c  in DIMACS:
-9056 -9057  9058 -1050  9059 0
-9056 -9057  9058 -1050 -9060 0
-9056 -9057  9058 -1050  9061 0

c  -1+1 --> 0
c    ( b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0 ∧  p_1050) -> (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧ -b^{5, 211}_0)
c  in CNF:
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_2
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_1
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_0
c  in DIMACS:
-9056  9057 -9058 -1050 -9059 0
-9056  9057 -9058 -1050 -9060 0
-9056  9057 -9058 -1050 -9061 0

c  0+1 --> 1
c    (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧  p_1050) -> (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0)
c  in CNF:
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_2
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_1
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨  b^{5, 211}_0
c  in DIMACS:
 9056  9057  9058 -1050 -9059 0
 9056  9057  9058 -1050 -9060 0
 9056  9057  9058 -1050  9061 0

c  1+1 --> 2
c    (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0 ∧  p_1050) -> (-b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0)
c  in CNF:
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_2
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨  b^{5, 211}_1
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ -p_1050 ∨ -b^{5, 211}_0
c  in DIMACS:
 9056  9057 -9058 -1050 -9059 0
 9056  9057 -9058 -1050  9060 0
 9056  9057 -9058 -1050 -9061 0

c  2+1 --> break 
c    (-b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 9056 -9057  9058 -1050 1162 0


c  2-1 --> 1
c    (-b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧ -p_1050) -> (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0)
c  in CNF:
c     b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_2
c     b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_1
c     b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨  b^{5, 211}_0
c  in DIMACS:
 9056 -9057  9058  1050 -9059 0
 9056 -9057  9058  1050 -9060 0
 9056 -9057  9058  1050  9061 0

c  1-1 --> 0
c    (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0 ∧ -p_1050) -> (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧ -b^{5, 211}_0)
c  in CNF:
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_2
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_1
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_0
c  in DIMACS:
 9056  9057 -9058  1050 -9059 0
 9056  9057 -9058  1050 -9060 0
 9056  9057 -9058  1050 -9061 0

c  0-1 --> -1
c    (-b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧ -p_1050) -> ( b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0)
c  in CNF:
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨  b^{5, 211}_2
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_1
c     b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨  b^{5, 211}_0
c  in DIMACS:
 9056  9057  9058  1050  9059 0
 9056  9057  9058  1050 -9060 0
 9056  9057  9058  1050  9061 0

c  -1-1 --> -2
c    ( b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧  b^{5, 210}_0 ∧ -p_1050) -> ( b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0)
c  in CNF:
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨  b^{5, 211}_2
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨  b^{5, 211}_1
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨  p_1050 ∨ -b^{5, 211}_0
c  in DIMACS:
-9056  9057 -9058  1050  9059 0
-9056  9057 -9058  1050  9060 0
-9056  9057 -9058  1050 -9061 0

c  -2-1 --> break 
c    ( b^{5, 210}_2 ∧  b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨  b^{5, 210}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-9056 -9057  9058  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 210}_2 ∧ -b^{5, 210}_1 ∧ -b^{5, 210}_0 ∧ true) 
c  in CNF:
c    -b^{5, 210}_2 ∨  b^{5, 210}_1 ∨  b^{5, 210}_0 ∨ false 
c  in DIMACS:
-9056  9057  9058  0

c  3 does not represent an automaton state.
c    -(-b^{5, 210}_2 ∧  b^{5, 210}_1 ∧  b^{5, 210}_0 ∧ true) 
c  in CNF:
c     b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ false 
c  in DIMACS:
 9056 -9057 -9058  0
c  -3 does not represent an automaton state.
c    -( b^{5, 210}_2 ∧  b^{5, 210}_1 ∧  b^{5, 210}_0 ∧ true) 
c  in CNF:
c    -b^{5, 210}_2 ∨ -b^{5, 210}_1 ∨ -b^{5, 210}_0 ∨ false 
c  in DIMACS:
-9056 -9057 -9058  0

c i = 211
c  -2+1 --> -1
c    ( b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧  p_1055) -> ( b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0)
c  in CNF:
c    -b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨  b^{5, 212}_2
c    -b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_1
c    -b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨  b^{5, 212}_0
c  in DIMACS:
-9059 -9060  9061 -1055  9062 0
-9059 -9060  9061 -1055 -9063 0
-9059 -9060  9061 -1055  9064 0

c  -1+1 --> 0
c    ( b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0 ∧  p_1055) -> (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧ -b^{5, 212}_0)
c  in CNF:
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_2
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_1
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_0
c  in DIMACS:
-9059  9060 -9061 -1055 -9062 0
-9059  9060 -9061 -1055 -9063 0
-9059  9060 -9061 -1055 -9064 0

c  0+1 --> 1
c    (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧  p_1055) -> (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0)
c  in CNF:
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_2
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_1
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨  b^{5, 212}_0
c  in DIMACS:
 9059  9060  9061 -1055 -9062 0
 9059  9060  9061 -1055 -9063 0
 9059  9060  9061 -1055  9064 0

c  1+1 --> 2
c    (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0 ∧  p_1055) -> (-b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0)
c  in CNF:
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_2
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨  b^{5, 212}_1
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ -p_1055 ∨ -b^{5, 212}_0
c  in DIMACS:
 9059  9060 -9061 -1055 -9062 0
 9059  9060 -9061 -1055  9063 0
 9059  9060 -9061 -1055 -9064 0

c  2+1 --> break 
c    (-b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧  p_1055) -> break
c  in CNF:
c     b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ -p_1055 ∨ break
c  in DIMACS:
 9059 -9060  9061 -1055 1162 0


c  2-1 --> 1
c    (-b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧ -p_1055) -> (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0)
c  in CNF:
c     b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_2
c     b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_1
c     b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨  b^{5, 212}_0
c  in DIMACS:
 9059 -9060  9061  1055 -9062 0
 9059 -9060  9061  1055 -9063 0
 9059 -9060  9061  1055  9064 0

c  1-1 --> 0
c    (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0 ∧ -p_1055) -> (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧ -b^{5, 212}_0)
c  in CNF:
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_2
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_1
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_0
c  in DIMACS:
 9059  9060 -9061  1055 -9062 0
 9059  9060 -9061  1055 -9063 0
 9059  9060 -9061  1055 -9064 0

c  0-1 --> -1
c    (-b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧ -p_1055) -> ( b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0)
c  in CNF:
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨  b^{5, 212}_2
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_1
c     b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨  b^{5, 212}_0
c  in DIMACS:
 9059  9060  9061  1055  9062 0
 9059  9060  9061  1055 -9063 0
 9059  9060  9061  1055  9064 0

c  -1-1 --> -2
c    ( b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧  b^{5, 211}_0 ∧ -p_1055) -> ( b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0)
c  in CNF:
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨  b^{5, 212}_2
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨  b^{5, 212}_1
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨  p_1055 ∨ -b^{5, 212}_0
c  in DIMACS:
-9059  9060 -9061  1055  9062 0
-9059  9060 -9061  1055  9063 0
-9059  9060 -9061  1055 -9064 0

c  -2-1 --> break 
c    ( b^{5, 211}_2 ∧  b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧ -p_1055) -> break
c  in CNF:
c    -b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨  b^{5, 211}_0 ∨  p_1055 ∨ break
c  in DIMACS:
-9059 -9060  9061  1055 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 211}_2 ∧ -b^{5, 211}_1 ∧ -b^{5, 211}_0 ∧ true) 
c  in CNF:
c    -b^{5, 211}_2 ∨  b^{5, 211}_1 ∨  b^{5, 211}_0 ∨ false 
c  in DIMACS:
-9059  9060  9061  0

c  3 does not represent an automaton state.
c    -(-b^{5, 211}_2 ∧  b^{5, 211}_1 ∧  b^{5, 211}_0 ∧ true) 
c  in CNF:
c     b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ false 
c  in DIMACS:
 9059 -9060 -9061  0
c  -3 does not represent an automaton state.
c    -( b^{5, 211}_2 ∧  b^{5, 211}_1 ∧  b^{5, 211}_0 ∧ true) 
c  in CNF:
c    -b^{5, 211}_2 ∨ -b^{5, 211}_1 ∨ -b^{5, 211}_0 ∨ false 
c  in DIMACS:
-9059 -9060 -9061  0

c i = 212
c  -2+1 --> -1
c    ( b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧  p_1060) -> ( b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0)
c  in CNF:
c    -b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨  b^{5, 213}_2
c    -b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_1
c    -b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨  b^{5, 213}_0
c  in DIMACS:
-9062 -9063  9064 -1060  9065 0
-9062 -9063  9064 -1060 -9066 0
-9062 -9063  9064 -1060  9067 0

c  -1+1 --> 0
c    ( b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0 ∧  p_1060) -> (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧ -b^{5, 213}_0)
c  in CNF:
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_2
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_1
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_0
c  in DIMACS:
-9062  9063 -9064 -1060 -9065 0
-9062  9063 -9064 -1060 -9066 0
-9062  9063 -9064 -1060 -9067 0

c  0+1 --> 1
c    (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧  p_1060) -> (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0)
c  in CNF:
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_2
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_1
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨  b^{5, 213}_0
c  in DIMACS:
 9062  9063  9064 -1060 -9065 0
 9062  9063  9064 -1060 -9066 0
 9062  9063  9064 -1060  9067 0

c  1+1 --> 2
c    (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0 ∧  p_1060) -> (-b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0)
c  in CNF:
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_2
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨  b^{5, 213}_1
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ -p_1060 ∨ -b^{5, 213}_0
c  in DIMACS:
 9062  9063 -9064 -1060 -9065 0
 9062  9063 -9064 -1060  9066 0
 9062  9063 -9064 -1060 -9067 0

c  2+1 --> break 
c    (-b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 9062 -9063  9064 -1060 1162 0


c  2-1 --> 1
c    (-b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧ -p_1060) -> (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0)
c  in CNF:
c     b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_2
c     b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_1
c     b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨  b^{5, 213}_0
c  in DIMACS:
 9062 -9063  9064  1060 -9065 0
 9062 -9063  9064  1060 -9066 0
 9062 -9063  9064  1060  9067 0

c  1-1 --> 0
c    (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0 ∧ -p_1060) -> (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧ -b^{5, 213}_0)
c  in CNF:
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_2
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_1
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_0
c  in DIMACS:
 9062  9063 -9064  1060 -9065 0
 9062  9063 -9064  1060 -9066 0
 9062  9063 -9064  1060 -9067 0

c  0-1 --> -1
c    (-b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧ -p_1060) -> ( b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0)
c  in CNF:
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨  b^{5, 213}_2
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_1
c     b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨  b^{5, 213}_0
c  in DIMACS:
 9062  9063  9064  1060  9065 0
 9062  9063  9064  1060 -9066 0
 9062  9063  9064  1060  9067 0

c  -1-1 --> -2
c    ( b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧  b^{5, 212}_0 ∧ -p_1060) -> ( b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0)
c  in CNF:
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨  b^{5, 213}_2
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨  b^{5, 213}_1
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨  p_1060 ∨ -b^{5, 213}_0
c  in DIMACS:
-9062  9063 -9064  1060  9065 0
-9062  9063 -9064  1060  9066 0
-9062  9063 -9064  1060 -9067 0

c  -2-1 --> break 
c    ( b^{5, 212}_2 ∧  b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨  b^{5, 212}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-9062 -9063  9064  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 212}_2 ∧ -b^{5, 212}_1 ∧ -b^{5, 212}_0 ∧ true) 
c  in CNF:
c    -b^{5, 212}_2 ∨  b^{5, 212}_1 ∨  b^{5, 212}_0 ∨ false 
c  in DIMACS:
-9062  9063  9064  0

c  3 does not represent an automaton state.
c    -(-b^{5, 212}_2 ∧  b^{5, 212}_1 ∧  b^{5, 212}_0 ∧ true) 
c  in CNF:
c     b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ false 
c  in DIMACS:
 9062 -9063 -9064  0
c  -3 does not represent an automaton state.
c    -( b^{5, 212}_2 ∧  b^{5, 212}_1 ∧  b^{5, 212}_0 ∧ true) 
c  in CNF:
c    -b^{5, 212}_2 ∨ -b^{5, 212}_1 ∨ -b^{5, 212}_0 ∨ false 
c  in DIMACS:
-9062 -9063 -9064  0

c i = 213
c  -2+1 --> -1
c    ( b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧  p_1065) -> ( b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0)
c  in CNF:
c    -b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨  b^{5, 214}_2
c    -b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_1
c    -b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨  b^{5, 214}_0
c  in DIMACS:
-9065 -9066  9067 -1065  9068 0
-9065 -9066  9067 -1065 -9069 0
-9065 -9066  9067 -1065  9070 0

c  -1+1 --> 0
c    ( b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0 ∧  p_1065) -> (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧ -b^{5, 214}_0)
c  in CNF:
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_2
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_1
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_0
c  in DIMACS:
-9065  9066 -9067 -1065 -9068 0
-9065  9066 -9067 -1065 -9069 0
-9065  9066 -9067 -1065 -9070 0

c  0+1 --> 1
c    (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧  p_1065) -> (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0)
c  in CNF:
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_2
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_1
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨  b^{5, 214}_0
c  in DIMACS:
 9065  9066  9067 -1065 -9068 0
 9065  9066  9067 -1065 -9069 0
 9065  9066  9067 -1065  9070 0

c  1+1 --> 2
c    (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0 ∧  p_1065) -> (-b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0)
c  in CNF:
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_2
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨  b^{5, 214}_1
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ -p_1065 ∨ -b^{5, 214}_0
c  in DIMACS:
 9065  9066 -9067 -1065 -9068 0
 9065  9066 -9067 -1065  9069 0
 9065  9066 -9067 -1065 -9070 0

c  2+1 --> break 
c    (-b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 9065 -9066  9067 -1065 1162 0


c  2-1 --> 1
c    (-b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧ -p_1065) -> (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0)
c  in CNF:
c     b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_2
c     b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_1
c     b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨  b^{5, 214}_0
c  in DIMACS:
 9065 -9066  9067  1065 -9068 0
 9065 -9066  9067  1065 -9069 0
 9065 -9066  9067  1065  9070 0

c  1-1 --> 0
c    (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0 ∧ -p_1065) -> (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧ -b^{5, 214}_0)
c  in CNF:
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_2
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_1
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_0
c  in DIMACS:
 9065  9066 -9067  1065 -9068 0
 9065  9066 -9067  1065 -9069 0
 9065  9066 -9067  1065 -9070 0

c  0-1 --> -1
c    (-b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧ -p_1065) -> ( b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0)
c  in CNF:
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨  b^{5, 214}_2
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_1
c     b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨  b^{5, 214}_0
c  in DIMACS:
 9065  9066  9067  1065  9068 0
 9065  9066  9067  1065 -9069 0
 9065  9066  9067  1065  9070 0

c  -1-1 --> -2
c    ( b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧  b^{5, 213}_0 ∧ -p_1065) -> ( b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0)
c  in CNF:
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨  b^{5, 214}_2
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨  b^{5, 214}_1
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨  p_1065 ∨ -b^{5, 214}_0
c  in DIMACS:
-9065  9066 -9067  1065  9068 0
-9065  9066 -9067  1065  9069 0
-9065  9066 -9067  1065 -9070 0

c  -2-1 --> break 
c    ( b^{5, 213}_2 ∧  b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨  b^{5, 213}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-9065 -9066  9067  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 213}_2 ∧ -b^{5, 213}_1 ∧ -b^{5, 213}_0 ∧ true) 
c  in CNF:
c    -b^{5, 213}_2 ∨  b^{5, 213}_1 ∨  b^{5, 213}_0 ∨ false 
c  in DIMACS:
-9065  9066  9067  0

c  3 does not represent an automaton state.
c    -(-b^{5, 213}_2 ∧  b^{5, 213}_1 ∧  b^{5, 213}_0 ∧ true) 
c  in CNF:
c     b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ false 
c  in DIMACS:
 9065 -9066 -9067  0
c  -3 does not represent an automaton state.
c    -( b^{5, 213}_2 ∧  b^{5, 213}_1 ∧  b^{5, 213}_0 ∧ true) 
c  in CNF:
c    -b^{5, 213}_2 ∨ -b^{5, 213}_1 ∨ -b^{5, 213}_0 ∨ false 
c  in DIMACS:
-9065 -9066 -9067  0

c i = 214
c  -2+1 --> -1
c    ( b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧  p_1070) -> ( b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0)
c  in CNF:
c    -b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨  b^{5, 215}_2
c    -b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_1
c    -b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨  b^{5, 215}_0
c  in DIMACS:
-9068 -9069  9070 -1070  9071 0
-9068 -9069  9070 -1070 -9072 0
-9068 -9069  9070 -1070  9073 0

c  -1+1 --> 0
c    ( b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0 ∧  p_1070) -> (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧ -b^{5, 215}_0)
c  in CNF:
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_2
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_1
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_0
c  in DIMACS:
-9068  9069 -9070 -1070 -9071 0
-9068  9069 -9070 -1070 -9072 0
-9068  9069 -9070 -1070 -9073 0

c  0+1 --> 1
c    (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧  p_1070) -> (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0)
c  in CNF:
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_2
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_1
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨  b^{5, 215}_0
c  in DIMACS:
 9068  9069  9070 -1070 -9071 0
 9068  9069  9070 -1070 -9072 0
 9068  9069  9070 -1070  9073 0

c  1+1 --> 2
c    (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0 ∧  p_1070) -> (-b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0)
c  in CNF:
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_2
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨  b^{5, 215}_1
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ -p_1070 ∨ -b^{5, 215}_0
c  in DIMACS:
 9068  9069 -9070 -1070 -9071 0
 9068  9069 -9070 -1070  9072 0
 9068  9069 -9070 -1070 -9073 0

c  2+1 --> break 
c    (-b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 9068 -9069  9070 -1070 1162 0


c  2-1 --> 1
c    (-b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧ -p_1070) -> (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0)
c  in CNF:
c     b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_2
c     b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_1
c     b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨  b^{5, 215}_0
c  in DIMACS:
 9068 -9069  9070  1070 -9071 0
 9068 -9069  9070  1070 -9072 0
 9068 -9069  9070  1070  9073 0

c  1-1 --> 0
c    (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0 ∧ -p_1070) -> (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧ -b^{5, 215}_0)
c  in CNF:
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_2
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_1
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_0
c  in DIMACS:
 9068  9069 -9070  1070 -9071 0
 9068  9069 -9070  1070 -9072 0
 9068  9069 -9070  1070 -9073 0

c  0-1 --> -1
c    (-b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧ -p_1070) -> ( b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0)
c  in CNF:
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨  b^{5, 215}_2
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_1
c     b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨  b^{5, 215}_0
c  in DIMACS:
 9068  9069  9070  1070  9071 0
 9068  9069  9070  1070 -9072 0
 9068  9069  9070  1070  9073 0

c  -1-1 --> -2
c    ( b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧  b^{5, 214}_0 ∧ -p_1070) -> ( b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0)
c  in CNF:
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨  b^{5, 215}_2
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨  b^{5, 215}_1
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨  p_1070 ∨ -b^{5, 215}_0
c  in DIMACS:
-9068  9069 -9070  1070  9071 0
-9068  9069 -9070  1070  9072 0
-9068  9069 -9070  1070 -9073 0

c  -2-1 --> break 
c    ( b^{5, 214}_2 ∧  b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨  b^{5, 214}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-9068 -9069  9070  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 214}_2 ∧ -b^{5, 214}_1 ∧ -b^{5, 214}_0 ∧ true) 
c  in CNF:
c    -b^{5, 214}_2 ∨  b^{5, 214}_1 ∨  b^{5, 214}_0 ∨ false 
c  in DIMACS:
-9068  9069  9070  0

c  3 does not represent an automaton state.
c    -(-b^{5, 214}_2 ∧  b^{5, 214}_1 ∧  b^{5, 214}_0 ∧ true) 
c  in CNF:
c     b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ false 
c  in DIMACS:
 9068 -9069 -9070  0
c  -3 does not represent an automaton state.
c    -( b^{5, 214}_2 ∧  b^{5, 214}_1 ∧  b^{5, 214}_0 ∧ true) 
c  in CNF:
c    -b^{5, 214}_2 ∨ -b^{5, 214}_1 ∨ -b^{5, 214}_0 ∨ false 
c  in DIMACS:
-9068 -9069 -9070  0

c i = 215
c  -2+1 --> -1
c    ( b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧  p_1075) -> ( b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0)
c  in CNF:
c    -b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨  b^{5, 216}_2
c    -b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_1
c    -b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨  b^{5, 216}_0
c  in DIMACS:
-9071 -9072  9073 -1075  9074 0
-9071 -9072  9073 -1075 -9075 0
-9071 -9072  9073 -1075  9076 0

c  -1+1 --> 0
c    ( b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0 ∧  p_1075) -> (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧ -b^{5, 216}_0)
c  in CNF:
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_2
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_1
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_0
c  in DIMACS:
-9071  9072 -9073 -1075 -9074 0
-9071  9072 -9073 -1075 -9075 0
-9071  9072 -9073 -1075 -9076 0

c  0+1 --> 1
c    (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧  p_1075) -> (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0)
c  in CNF:
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_2
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_1
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨  b^{5, 216}_0
c  in DIMACS:
 9071  9072  9073 -1075 -9074 0
 9071  9072  9073 -1075 -9075 0
 9071  9072  9073 -1075  9076 0

c  1+1 --> 2
c    (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0 ∧  p_1075) -> (-b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0)
c  in CNF:
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_2
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨  b^{5, 216}_1
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ -p_1075 ∨ -b^{5, 216}_0
c  in DIMACS:
 9071  9072 -9073 -1075 -9074 0
 9071  9072 -9073 -1075  9075 0
 9071  9072 -9073 -1075 -9076 0

c  2+1 --> break 
c    (-b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧  p_1075) -> break
c  in CNF:
c     b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ -p_1075 ∨ break
c  in DIMACS:
 9071 -9072  9073 -1075 1162 0


c  2-1 --> 1
c    (-b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧ -p_1075) -> (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0)
c  in CNF:
c     b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_2
c     b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_1
c     b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨  b^{5, 216}_0
c  in DIMACS:
 9071 -9072  9073  1075 -9074 0
 9071 -9072  9073  1075 -9075 0
 9071 -9072  9073  1075  9076 0

c  1-1 --> 0
c    (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0 ∧ -p_1075) -> (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧ -b^{5, 216}_0)
c  in CNF:
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_2
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_1
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_0
c  in DIMACS:
 9071  9072 -9073  1075 -9074 0
 9071  9072 -9073  1075 -9075 0
 9071  9072 -9073  1075 -9076 0

c  0-1 --> -1
c    (-b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧ -p_1075) -> ( b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0)
c  in CNF:
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨  b^{5, 216}_2
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_1
c     b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨  b^{5, 216}_0
c  in DIMACS:
 9071  9072  9073  1075  9074 0
 9071  9072  9073  1075 -9075 0
 9071  9072  9073  1075  9076 0

c  -1-1 --> -2
c    ( b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧  b^{5, 215}_0 ∧ -p_1075) -> ( b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0)
c  in CNF:
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨  b^{5, 216}_2
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨  b^{5, 216}_1
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨  p_1075 ∨ -b^{5, 216}_0
c  in DIMACS:
-9071  9072 -9073  1075  9074 0
-9071  9072 -9073  1075  9075 0
-9071  9072 -9073  1075 -9076 0

c  -2-1 --> break 
c    ( b^{5, 215}_2 ∧  b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧ -p_1075) -> break
c  in CNF:
c    -b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨  b^{5, 215}_0 ∨  p_1075 ∨ break
c  in DIMACS:
-9071 -9072  9073  1075 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 215}_2 ∧ -b^{5, 215}_1 ∧ -b^{5, 215}_0 ∧ true) 
c  in CNF:
c    -b^{5, 215}_2 ∨  b^{5, 215}_1 ∨  b^{5, 215}_0 ∨ false 
c  in DIMACS:
-9071  9072  9073  0

c  3 does not represent an automaton state.
c    -(-b^{5, 215}_2 ∧  b^{5, 215}_1 ∧  b^{5, 215}_0 ∧ true) 
c  in CNF:
c     b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ false 
c  in DIMACS:
 9071 -9072 -9073  0
c  -3 does not represent an automaton state.
c    -( b^{5, 215}_2 ∧  b^{5, 215}_1 ∧  b^{5, 215}_0 ∧ true) 
c  in CNF:
c    -b^{5, 215}_2 ∨ -b^{5, 215}_1 ∨ -b^{5, 215}_0 ∨ false 
c  in DIMACS:
-9071 -9072 -9073  0

c i = 216
c  -2+1 --> -1
c    ( b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧  p_1080) -> ( b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0)
c  in CNF:
c    -b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨  b^{5, 217}_2
c    -b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_1
c    -b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨  b^{5, 217}_0
c  in DIMACS:
-9074 -9075  9076 -1080  9077 0
-9074 -9075  9076 -1080 -9078 0
-9074 -9075  9076 -1080  9079 0

c  -1+1 --> 0
c    ( b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0 ∧  p_1080) -> (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧ -b^{5, 217}_0)
c  in CNF:
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_2
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_1
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_0
c  in DIMACS:
-9074  9075 -9076 -1080 -9077 0
-9074  9075 -9076 -1080 -9078 0
-9074  9075 -9076 -1080 -9079 0

c  0+1 --> 1
c    (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧  p_1080) -> (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0)
c  in CNF:
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_2
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_1
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨  b^{5, 217}_0
c  in DIMACS:
 9074  9075  9076 -1080 -9077 0
 9074  9075  9076 -1080 -9078 0
 9074  9075  9076 -1080  9079 0

c  1+1 --> 2
c    (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0 ∧  p_1080) -> (-b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0)
c  in CNF:
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_2
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨  b^{5, 217}_1
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ -p_1080 ∨ -b^{5, 217}_0
c  in DIMACS:
 9074  9075 -9076 -1080 -9077 0
 9074  9075 -9076 -1080  9078 0
 9074  9075 -9076 -1080 -9079 0

c  2+1 --> break 
c    (-b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 9074 -9075  9076 -1080 1162 0


c  2-1 --> 1
c    (-b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧ -p_1080) -> (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0)
c  in CNF:
c     b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_2
c     b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_1
c     b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨  b^{5, 217}_0
c  in DIMACS:
 9074 -9075  9076  1080 -9077 0
 9074 -9075  9076  1080 -9078 0
 9074 -9075  9076  1080  9079 0

c  1-1 --> 0
c    (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0 ∧ -p_1080) -> (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧ -b^{5, 217}_0)
c  in CNF:
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_2
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_1
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_0
c  in DIMACS:
 9074  9075 -9076  1080 -9077 0
 9074  9075 -9076  1080 -9078 0
 9074  9075 -9076  1080 -9079 0

c  0-1 --> -1
c    (-b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧ -p_1080) -> ( b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0)
c  in CNF:
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨  b^{5, 217}_2
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_1
c     b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨  b^{5, 217}_0
c  in DIMACS:
 9074  9075  9076  1080  9077 0
 9074  9075  9076  1080 -9078 0
 9074  9075  9076  1080  9079 0

c  -1-1 --> -2
c    ( b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧  b^{5, 216}_0 ∧ -p_1080) -> ( b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0)
c  in CNF:
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨  b^{5, 217}_2
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨  b^{5, 217}_1
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨  p_1080 ∨ -b^{5, 217}_0
c  in DIMACS:
-9074  9075 -9076  1080  9077 0
-9074  9075 -9076  1080  9078 0
-9074  9075 -9076  1080 -9079 0

c  -2-1 --> break 
c    ( b^{5, 216}_2 ∧  b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨  b^{5, 216}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-9074 -9075  9076  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 216}_2 ∧ -b^{5, 216}_1 ∧ -b^{5, 216}_0 ∧ true) 
c  in CNF:
c    -b^{5, 216}_2 ∨  b^{5, 216}_1 ∨  b^{5, 216}_0 ∨ false 
c  in DIMACS:
-9074  9075  9076  0

c  3 does not represent an automaton state.
c    -(-b^{5, 216}_2 ∧  b^{5, 216}_1 ∧  b^{5, 216}_0 ∧ true) 
c  in CNF:
c     b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ false 
c  in DIMACS:
 9074 -9075 -9076  0
c  -3 does not represent an automaton state.
c    -( b^{5, 216}_2 ∧  b^{5, 216}_1 ∧  b^{5, 216}_0 ∧ true) 
c  in CNF:
c    -b^{5, 216}_2 ∨ -b^{5, 216}_1 ∨ -b^{5, 216}_0 ∨ false 
c  in DIMACS:
-9074 -9075 -9076  0

c i = 217
c  -2+1 --> -1
c    ( b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧  p_1085) -> ( b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0)
c  in CNF:
c    -b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨  b^{5, 218}_2
c    -b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_1
c    -b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨  b^{5, 218}_0
c  in DIMACS:
-9077 -9078  9079 -1085  9080 0
-9077 -9078  9079 -1085 -9081 0
-9077 -9078  9079 -1085  9082 0

c  -1+1 --> 0
c    ( b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0 ∧  p_1085) -> (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧ -b^{5, 218}_0)
c  in CNF:
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_2
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_1
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_0
c  in DIMACS:
-9077  9078 -9079 -1085 -9080 0
-9077  9078 -9079 -1085 -9081 0
-9077  9078 -9079 -1085 -9082 0

c  0+1 --> 1
c    (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧  p_1085) -> (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0)
c  in CNF:
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_2
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_1
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨  b^{5, 218}_0
c  in DIMACS:
 9077  9078  9079 -1085 -9080 0
 9077  9078  9079 -1085 -9081 0
 9077  9078  9079 -1085  9082 0

c  1+1 --> 2
c    (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0 ∧  p_1085) -> (-b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0)
c  in CNF:
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_2
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨  b^{5, 218}_1
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ -p_1085 ∨ -b^{5, 218}_0
c  in DIMACS:
 9077  9078 -9079 -1085 -9080 0
 9077  9078 -9079 -1085  9081 0
 9077  9078 -9079 -1085 -9082 0

c  2+1 --> break 
c    (-b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 9077 -9078  9079 -1085 1162 0


c  2-1 --> 1
c    (-b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧ -p_1085) -> (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0)
c  in CNF:
c     b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_2
c     b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_1
c     b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨  b^{5, 218}_0
c  in DIMACS:
 9077 -9078  9079  1085 -9080 0
 9077 -9078  9079  1085 -9081 0
 9077 -9078  9079  1085  9082 0

c  1-1 --> 0
c    (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0 ∧ -p_1085) -> (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧ -b^{5, 218}_0)
c  in CNF:
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_2
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_1
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_0
c  in DIMACS:
 9077  9078 -9079  1085 -9080 0
 9077  9078 -9079  1085 -9081 0
 9077  9078 -9079  1085 -9082 0

c  0-1 --> -1
c    (-b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧ -p_1085) -> ( b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0)
c  in CNF:
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨  b^{5, 218}_2
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_1
c     b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨  b^{5, 218}_0
c  in DIMACS:
 9077  9078  9079  1085  9080 0
 9077  9078  9079  1085 -9081 0
 9077  9078  9079  1085  9082 0

c  -1-1 --> -2
c    ( b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧  b^{5, 217}_0 ∧ -p_1085) -> ( b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0)
c  in CNF:
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨  b^{5, 218}_2
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨  b^{5, 218}_1
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨  p_1085 ∨ -b^{5, 218}_0
c  in DIMACS:
-9077  9078 -9079  1085  9080 0
-9077  9078 -9079  1085  9081 0
-9077  9078 -9079  1085 -9082 0

c  -2-1 --> break 
c    ( b^{5, 217}_2 ∧  b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨  b^{5, 217}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-9077 -9078  9079  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 217}_2 ∧ -b^{5, 217}_1 ∧ -b^{5, 217}_0 ∧ true) 
c  in CNF:
c    -b^{5, 217}_2 ∨  b^{5, 217}_1 ∨  b^{5, 217}_0 ∨ false 
c  in DIMACS:
-9077  9078  9079  0

c  3 does not represent an automaton state.
c    -(-b^{5, 217}_2 ∧  b^{5, 217}_1 ∧  b^{5, 217}_0 ∧ true) 
c  in CNF:
c     b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ false 
c  in DIMACS:
 9077 -9078 -9079  0
c  -3 does not represent an automaton state.
c    -( b^{5, 217}_2 ∧  b^{5, 217}_1 ∧  b^{5, 217}_0 ∧ true) 
c  in CNF:
c    -b^{5, 217}_2 ∨ -b^{5, 217}_1 ∨ -b^{5, 217}_0 ∨ false 
c  in DIMACS:
-9077 -9078 -9079  0

c i = 218
c  -2+1 --> -1
c    ( b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧  p_1090) -> ( b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0)
c  in CNF:
c    -b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨  b^{5, 219}_2
c    -b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_1
c    -b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨  b^{5, 219}_0
c  in DIMACS:
-9080 -9081  9082 -1090  9083 0
-9080 -9081  9082 -1090 -9084 0
-9080 -9081  9082 -1090  9085 0

c  -1+1 --> 0
c    ( b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0 ∧  p_1090) -> (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧ -b^{5, 219}_0)
c  in CNF:
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_2
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_1
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_0
c  in DIMACS:
-9080  9081 -9082 -1090 -9083 0
-9080  9081 -9082 -1090 -9084 0
-9080  9081 -9082 -1090 -9085 0

c  0+1 --> 1
c    (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧  p_1090) -> (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0)
c  in CNF:
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_2
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_1
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨  b^{5, 219}_0
c  in DIMACS:
 9080  9081  9082 -1090 -9083 0
 9080  9081  9082 -1090 -9084 0
 9080  9081  9082 -1090  9085 0

c  1+1 --> 2
c    (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0 ∧  p_1090) -> (-b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0)
c  in CNF:
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_2
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨  b^{5, 219}_1
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ -p_1090 ∨ -b^{5, 219}_0
c  in DIMACS:
 9080  9081 -9082 -1090 -9083 0
 9080  9081 -9082 -1090  9084 0
 9080  9081 -9082 -1090 -9085 0

c  2+1 --> break 
c    (-b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 9080 -9081  9082 -1090 1162 0


c  2-1 --> 1
c    (-b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧ -p_1090) -> (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0)
c  in CNF:
c     b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_2
c     b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_1
c     b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨  b^{5, 219}_0
c  in DIMACS:
 9080 -9081  9082  1090 -9083 0
 9080 -9081  9082  1090 -9084 0
 9080 -9081  9082  1090  9085 0

c  1-1 --> 0
c    (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0 ∧ -p_1090) -> (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧ -b^{5, 219}_0)
c  in CNF:
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_2
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_1
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_0
c  in DIMACS:
 9080  9081 -9082  1090 -9083 0
 9080  9081 -9082  1090 -9084 0
 9080  9081 -9082  1090 -9085 0

c  0-1 --> -1
c    (-b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧ -p_1090) -> ( b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0)
c  in CNF:
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨  b^{5, 219}_2
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_1
c     b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨  b^{5, 219}_0
c  in DIMACS:
 9080  9081  9082  1090  9083 0
 9080  9081  9082  1090 -9084 0
 9080  9081  9082  1090  9085 0

c  -1-1 --> -2
c    ( b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧  b^{5, 218}_0 ∧ -p_1090) -> ( b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0)
c  in CNF:
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨  b^{5, 219}_2
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨  b^{5, 219}_1
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨  p_1090 ∨ -b^{5, 219}_0
c  in DIMACS:
-9080  9081 -9082  1090  9083 0
-9080  9081 -9082  1090  9084 0
-9080  9081 -9082  1090 -9085 0

c  -2-1 --> break 
c    ( b^{5, 218}_2 ∧  b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨  b^{5, 218}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-9080 -9081  9082  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 218}_2 ∧ -b^{5, 218}_1 ∧ -b^{5, 218}_0 ∧ true) 
c  in CNF:
c    -b^{5, 218}_2 ∨  b^{5, 218}_1 ∨  b^{5, 218}_0 ∨ false 
c  in DIMACS:
-9080  9081  9082  0

c  3 does not represent an automaton state.
c    -(-b^{5, 218}_2 ∧  b^{5, 218}_1 ∧  b^{5, 218}_0 ∧ true) 
c  in CNF:
c     b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ false 
c  in DIMACS:
 9080 -9081 -9082  0
c  -3 does not represent an automaton state.
c    -( b^{5, 218}_2 ∧  b^{5, 218}_1 ∧  b^{5, 218}_0 ∧ true) 
c  in CNF:
c    -b^{5, 218}_2 ∨ -b^{5, 218}_1 ∨ -b^{5, 218}_0 ∨ false 
c  in DIMACS:
-9080 -9081 -9082  0

c i = 219
c  -2+1 --> -1
c    ( b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧  p_1095) -> ( b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0)
c  in CNF:
c    -b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨  b^{5, 220}_2
c    -b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_1
c    -b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨  b^{5, 220}_0
c  in DIMACS:
-9083 -9084  9085 -1095  9086 0
-9083 -9084  9085 -1095 -9087 0
-9083 -9084  9085 -1095  9088 0

c  -1+1 --> 0
c    ( b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0 ∧  p_1095) -> (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧ -b^{5, 220}_0)
c  in CNF:
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_2
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_1
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_0
c  in DIMACS:
-9083  9084 -9085 -1095 -9086 0
-9083  9084 -9085 -1095 -9087 0
-9083  9084 -9085 -1095 -9088 0

c  0+1 --> 1
c    (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧  p_1095) -> (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0)
c  in CNF:
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_2
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_1
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨  b^{5, 220}_0
c  in DIMACS:
 9083  9084  9085 -1095 -9086 0
 9083  9084  9085 -1095 -9087 0
 9083  9084  9085 -1095  9088 0

c  1+1 --> 2
c    (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0 ∧  p_1095) -> (-b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0)
c  in CNF:
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_2
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨  b^{5, 220}_1
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ -p_1095 ∨ -b^{5, 220}_0
c  in DIMACS:
 9083  9084 -9085 -1095 -9086 0
 9083  9084 -9085 -1095  9087 0
 9083  9084 -9085 -1095 -9088 0

c  2+1 --> break 
c    (-b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 9083 -9084  9085 -1095 1162 0


c  2-1 --> 1
c    (-b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧ -p_1095) -> (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0)
c  in CNF:
c     b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_2
c     b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_1
c     b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨  b^{5, 220}_0
c  in DIMACS:
 9083 -9084  9085  1095 -9086 0
 9083 -9084  9085  1095 -9087 0
 9083 -9084  9085  1095  9088 0

c  1-1 --> 0
c    (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0 ∧ -p_1095) -> (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧ -b^{5, 220}_0)
c  in CNF:
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_2
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_1
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_0
c  in DIMACS:
 9083  9084 -9085  1095 -9086 0
 9083  9084 -9085  1095 -9087 0
 9083  9084 -9085  1095 -9088 0

c  0-1 --> -1
c    (-b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧ -p_1095) -> ( b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0)
c  in CNF:
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨  b^{5, 220}_2
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_1
c     b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨  b^{5, 220}_0
c  in DIMACS:
 9083  9084  9085  1095  9086 0
 9083  9084  9085  1095 -9087 0
 9083  9084  9085  1095  9088 0

c  -1-1 --> -2
c    ( b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧  b^{5, 219}_0 ∧ -p_1095) -> ( b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0)
c  in CNF:
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨  b^{5, 220}_2
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨  b^{5, 220}_1
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨  p_1095 ∨ -b^{5, 220}_0
c  in DIMACS:
-9083  9084 -9085  1095  9086 0
-9083  9084 -9085  1095  9087 0
-9083  9084 -9085  1095 -9088 0

c  -2-1 --> break 
c    ( b^{5, 219}_2 ∧  b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨  b^{5, 219}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-9083 -9084  9085  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 219}_2 ∧ -b^{5, 219}_1 ∧ -b^{5, 219}_0 ∧ true) 
c  in CNF:
c    -b^{5, 219}_2 ∨  b^{5, 219}_1 ∨  b^{5, 219}_0 ∨ false 
c  in DIMACS:
-9083  9084  9085  0

c  3 does not represent an automaton state.
c    -(-b^{5, 219}_2 ∧  b^{5, 219}_1 ∧  b^{5, 219}_0 ∧ true) 
c  in CNF:
c     b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ false 
c  in DIMACS:
 9083 -9084 -9085  0
c  -3 does not represent an automaton state.
c    -( b^{5, 219}_2 ∧  b^{5, 219}_1 ∧  b^{5, 219}_0 ∧ true) 
c  in CNF:
c    -b^{5, 219}_2 ∨ -b^{5, 219}_1 ∨ -b^{5, 219}_0 ∨ false 
c  in DIMACS:
-9083 -9084 -9085  0

c i = 220
c  -2+1 --> -1
c    ( b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧  p_1100) -> ( b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0)
c  in CNF:
c    -b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨  b^{5, 221}_2
c    -b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_1
c    -b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨  b^{5, 221}_0
c  in DIMACS:
-9086 -9087  9088 -1100  9089 0
-9086 -9087  9088 -1100 -9090 0
-9086 -9087  9088 -1100  9091 0

c  -1+1 --> 0
c    ( b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0 ∧  p_1100) -> (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧ -b^{5, 221}_0)
c  in CNF:
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_2
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_1
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_0
c  in DIMACS:
-9086  9087 -9088 -1100 -9089 0
-9086  9087 -9088 -1100 -9090 0
-9086  9087 -9088 -1100 -9091 0

c  0+1 --> 1
c    (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧  p_1100) -> (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0)
c  in CNF:
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_2
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_1
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨  b^{5, 221}_0
c  in DIMACS:
 9086  9087  9088 -1100 -9089 0
 9086  9087  9088 -1100 -9090 0
 9086  9087  9088 -1100  9091 0

c  1+1 --> 2
c    (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0 ∧  p_1100) -> (-b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0)
c  in CNF:
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_2
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨  b^{5, 221}_1
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ -p_1100 ∨ -b^{5, 221}_0
c  in DIMACS:
 9086  9087 -9088 -1100 -9089 0
 9086  9087 -9088 -1100  9090 0
 9086  9087 -9088 -1100 -9091 0

c  2+1 --> break 
c    (-b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 9086 -9087  9088 -1100 1162 0


c  2-1 --> 1
c    (-b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧ -p_1100) -> (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0)
c  in CNF:
c     b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_2
c     b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_1
c     b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨  b^{5, 221}_0
c  in DIMACS:
 9086 -9087  9088  1100 -9089 0
 9086 -9087  9088  1100 -9090 0
 9086 -9087  9088  1100  9091 0

c  1-1 --> 0
c    (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0 ∧ -p_1100) -> (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧ -b^{5, 221}_0)
c  in CNF:
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_2
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_1
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_0
c  in DIMACS:
 9086  9087 -9088  1100 -9089 0
 9086  9087 -9088  1100 -9090 0
 9086  9087 -9088  1100 -9091 0

c  0-1 --> -1
c    (-b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧ -p_1100) -> ( b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0)
c  in CNF:
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨  b^{5, 221}_2
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_1
c     b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨  b^{5, 221}_0
c  in DIMACS:
 9086  9087  9088  1100  9089 0
 9086  9087  9088  1100 -9090 0
 9086  9087  9088  1100  9091 0

c  -1-1 --> -2
c    ( b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧  b^{5, 220}_0 ∧ -p_1100) -> ( b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0)
c  in CNF:
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨  b^{5, 221}_2
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨  b^{5, 221}_1
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨  p_1100 ∨ -b^{5, 221}_0
c  in DIMACS:
-9086  9087 -9088  1100  9089 0
-9086  9087 -9088  1100  9090 0
-9086  9087 -9088  1100 -9091 0

c  -2-1 --> break 
c    ( b^{5, 220}_2 ∧  b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨  b^{5, 220}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-9086 -9087  9088  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 220}_2 ∧ -b^{5, 220}_1 ∧ -b^{5, 220}_0 ∧ true) 
c  in CNF:
c    -b^{5, 220}_2 ∨  b^{5, 220}_1 ∨  b^{5, 220}_0 ∨ false 
c  in DIMACS:
-9086  9087  9088  0

c  3 does not represent an automaton state.
c    -(-b^{5, 220}_2 ∧  b^{5, 220}_1 ∧  b^{5, 220}_0 ∧ true) 
c  in CNF:
c     b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ false 
c  in DIMACS:
 9086 -9087 -9088  0
c  -3 does not represent an automaton state.
c    -( b^{5, 220}_2 ∧  b^{5, 220}_1 ∧  b^{5, 220}_0 ∧ true) 
c  in CNF:
c    -b^{5, 220}_2 ∨ -b^{5, 220}_1 ∨ -b^{5, 220}_0 ∨ false 
c  in DIMACS:
-9086 -9087 -9088  0

c i = 221
c  -2+1 --> -1
c    ( b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧  p_1105) -> ( b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0)
c  in CNF:
c    -b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨  b^{5, 222}_2
c    -b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_1
c    -b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨  b^{5, 222}_0
c  in DIMACS:
-9089 -9090  9091 -1105  9092 0
-9089 -9090  9091 -1105 -9093 0
-9089 -9090  9091 -1105  9094 0

c  -1+1 --> 0
c    ( b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0 ∧  p_1105) -> (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧ -b^{5, 222}_0)
c  in CNF:
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_2
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_1
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_0
c  in DIMACS:
-9089  9090 -9091 -1105 -9092 0
-9089  9090 -9091 -1105 -9093 0
-9089  9090 -9091 -1105 -9094 0

c  0+1 --> 1
c    (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧  p_1105) -> (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0)
c  in CNF:
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_2
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_1
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨  b^{5, 222}_0
c  in DIMACS:
 9089  9090  9091 -1105 -9092 0
 9089  9090  9091 -1105 -9093 0
 9089  9090  9091 -1105  9094 0

c  1+1 --> 2
c    (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0 ∧  p_1105) -> (-b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0)
c  in CNF:
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_2
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨  b^{5, 222}_1
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ -p_1105 ∨ -b^{5, 222}_0
c  in DIMACS:
 9089  9090 -9091 -1105 -9092 0
 9089  9090 -9091 -1105  9093 0
 9089  9090 -9091 -1105 -9094 0

c  2+1 --> break 
c    (-b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 9089 -9090  9091 -1105 1162 0


c  2-1 --> 1
c    (-b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧ -p_1105) -> (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0)
c  in CNF:
c     b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_2
c     b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_1
c     b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨  b^{5, 222}_0
c  in DIMACS:
 9089 -9090  9091  1105 -9092 0
 9089 -9090  9091  1105 -9093 0
 9089 -9090  9091  1105  9094 0

c  1-1 --> 0
c    (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0 ∧ -p_1105) -> (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧ -b^{5, 222}_0)
c  in CNF:
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_2
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_1
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_0
c  in DIMACS:
 9089  9090 -9091  1105 -9092 0
 9089  9090 -9091  1105 -9093 0
 9089  9090 -9091  1105 -9094 0

c  0-1 --> -1
c    (-b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧ -p_1105) -> ( b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0)
c  in CNF:
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨  b^{5, 222}_2
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_1
c     b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨  b^{5, 222}_0
c  in DIMACS:
 9089  9090  9091  1105  9092 0
 9089  9090  9091  1105 -9093 0
 9089  9090  9091  1105  9094 0

c  -1-1 --> -2
c    ( b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧  b^{5, 221}_0 ∧ -p_1105) -> ( b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0)
c  in CNF:
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨  b^{5, 222}_2
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨  b^{5, 222}_1
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨  p_1105 ∨ -b^{5, 222}_0
c  in DIMACS:
-9089  9090 -9091  1105  9092 0
-9089  9090 -9091  1105  9093 0
-9089  9090 -9091  1105 -9094 0

c  -2-1 --> break 
c    ( b^{5, 221}_2 ∧  b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨  b^{5, 221}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-9089 -9090  9091  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 221}_2 ∧ -b^{5, 221}_1 ∧ -b^{5, 221}_0 ∧ true) 
c  in CNF:
c    -b^{5, 221}_2 ∨  b^{5, 221}_1 ∨  b^{5, 221}_0 ∨ false 
c  in DIMACS:
-9089  9090  9091  0

c  3 does not represent an automaton state.
c    -(-b^{5, 221}_2 ∧  b^{5, 221}_1 ∧  b^{5, 221}_0 ∧ true) 
c  in CNF:
c     b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ false 
c  in DIMACS:
 9089 -9090 -9091  0
c  -3 does not represent an automaton state.
c    -( b^{5, 221}_2 ∧  b^{5, 221}_1 ∧  b^{5, 221}_0 ∧ true) 
c  in CNF:
c    -b^{5, 221}_2 ∨ -b^{5, 221}_1 ∨ -b^{5, 221}_0 ∨ false 
c  in DIMACS:
-9089 -9090 -9091  0

c i = 222
c  -2+1 --> -1
c    ( b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧  p_1110) -> ( b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0)
c  in CNF:
c    -b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨  b^{5, 223}_2
c    -b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_1
c    -b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨  b^{5, 223}_0
c  in DIMACS:
-9092 -9093  9094 -1110  9095 0
-9092 -9093  9094 -1110 -9096 0
-9092 -9093  9094 -1110  9097 0

c  -1+1 --> 0
c    ( b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0 ∧  p_1110) -> (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧ -b^{5, 223}_0)
c  in CNF:
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_2
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_1
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_0
c  in DIMACS:
-9092  9093 -9094 -1110 -9095 0
-9092  9093 -9094 -1110 -9096 0
-9092  9093 -9094 -1110 -9097 0

c  0+1 --> 1
c    (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧  p_1110) -> (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0)
c  in CNF:
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_2
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_1
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨  b^{5, 223}_0
c  in DIMACS:
 9092  9093  9094 -1110 -9095 0
 9092  9093  9094 -1110 -9096 0
 9092  9093  9094 -1110  9097 0

c  1+1 --> 2
c    (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0 ∧  p_1110) -> (-b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0)
c  in CNF:
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_2
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨  b^{5, 223}_1
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ -p_1110 ∨ -b^{5, 223}_0
c  in DIMACS:
 9092  9093 -9094 -1110 -9095 0
 9092  9093 -9094 -1110  9096 0
 9092  9093 -9094 -1110 -9097 0

c  2+1 --> break 
c    (-b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 9092 -9093  9094 -1110 1162 0


c  2-1 --> 1
c    (-b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧ -p_1110) -> (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0)
c  in CNF:
c     b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_2
c     b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_1
c     b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨  b^{5, 223}_0
c  in DIMACS:
 9092 -9093  9094  1110 -9095 0
 9092 -9093  9094  1110 -9096 0
 9092 -9093  9094  1110  9097 0

c  1-1 --> 0
c    (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0 ∧ -p_1110) -> (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧ -b^{5, 223}_0)
c  in CNF:
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_2
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_1
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_0
c  in DIMACS:
 9092  9093 -9094  1110 -9095 0
 9092  9093 -9094  1110 -9096 0
 9092  9093 -9094  1110 -9097 0

c  0-1 --> -1
c    (-b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧ -p_1110) -> ( b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0)
c  in CNF:
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨  b^{5, 223}_2
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_1
c     b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨  b^{5, 223}_0
c  in DIMACS:
 9092  9093  9094  1110  9095 0
 9092  9093  9094  1110 -9096 0
 9092  9093  9094  1110  9097 0

c  -1-1 --> -2
c    ( b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧  b^{5, 222}_0 ∧ -p_1110) -> ( b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0)
c  in CNF:
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨  b^{5, 223}_2
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨  b^{5, 223}_1
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨  p_1110 ∨ -b^{5, 223}_0
c  in DIMACS:
-9092  9093 -9094  1110  9095 0
-9092  9093 -9094  1110  9096 0
-9092  9093 -9094  1110 -9097 0

c  -2-1 --> break 
c    ( b^{5, 222}_2 ∧  b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨  b^{5, 222}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-9092 -9093  9094  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 222}_2 ∧ -b^{5, 222}_1 ∧ -b^{5, 222}_0 ∧ true) 
c  in CNF:
c    -b^{5, 222}_2 ∨  b^{5, 222}_1 ∨  b^{5, 222}_0 ∨ false 
c  in DIMACS:
-9092  9093  9094  0

c  3 does not represent an automaton state.
c    -(-b^{5, 222}_2 ∧  b^{5, 222}_1 ∧  b^{5, 222}_0 ∧ true) 
c  in CNF:
c     b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ false 
c  in DIMACS:
 9092 -9093 -9094  0
c  -3 does not represent an automaton state.
c    -( b^{5, 222}_2 ∧  b^{5, 222}_1 ∧  b^{5, 222}_0 ∧ true) 
c  in CNF:
c    -b^{5, 222}_2 ∨ -b^{5, 222}_1 ∨ -b^{5, 222}_0 ∨ false 
c  in DIMACS:
-9092 -9093 -9094  0

c i = 223
c  -2+1 --> -1
c    ( b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧  p_1115) -> ( b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0)
c  in CNF:
c    -b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨  b^{5, 224}_2
c    -b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_1
c    -b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨  b^{5, 224}_0
c  in DIMACS:
-9095 -9096  9097 -1115  9098 0
-9095 -9096  9097 -1115 -9099 0
-9095 -9096  9097 -1115  9100 0

c  -1+1 --> 0
c    ( b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0 ∧  p_1115) -> (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧ -b^{5, 224}_0)
c  in CNF:
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_2
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_1
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_0
c  in DIMACS:
-9095  9096 -9097 -1115 -9098 0
-9095  9096 -9097 -1115 -9099 0
-9095  9096 -9097 -1115 -9100 0

c  0+1 --> 1
c    (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧  p_1115) -> (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0)
c  in CNF:
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_2
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_1
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨  b^{5, 224}_0
c  in DIMACS:
 9095  9096  9097 -1115 -9098 0
 9095  9096  9097 -1115 -9099 0
 9095  9096  9097 -1115  9100 0

c  1+1 --> 2
c    (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0 ∧  p_1115) -> (-b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0)
c  in CNF:
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_2
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨  b^{5, 224}_1
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ -p_1115 ∨ -b^{5, 224}_0
c  in DIMACS:
 9095  9096 -9097 -1115 -9098 0
 9095  9096 -9097 -1115  9099 0
 9095  9096 -9097 -1115 -9100 0

c  2+1 --> break 
c    (-b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧  p_1115) -> break
c  in CNF:
c     b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ -p_1115 ∨ break
c  in DIMACS:
 9095 -9096  9097 -1115 1162 0


c  2-1 --> 1
c    (-b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧ -p_1115) -> (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0)
c  in CNF:
c     b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_2
c     b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_1
c     b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨  b^{5, 224}_0
c  in DIMACS:
 9095 -9096  9097  1115 -9098 0
 9095 -9096  9097  1115 -9099 0
 9095 -9096  9097  1115  9100 0

c  1-1 --> 0
c    (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0 ∧ -p_1115) -> (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧ -b^{5, 224}_0)
c  in CNF:
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_2
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_1
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_0
c  in DIMACS:
 9095  9096 -9097  1115 -9098 0
 9095  9096 -9097  1115 -9099 0
 9095  9096 -9097  1115 -9100 0

c  0-1 --> -1
c    (-b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧ -p_1115) -> ( b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0)
c  in CNF:
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨  b^{5, 224}_2
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_1
c     b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨  b^{5, 224}_0
c  in DIMACS:
 9095  9096  9097  1115  9098 0
 9095  9096  9097  1115 -9099 0
 9095  9096  9097  1115  9100 0

c  -1-1 --> -2
c    ( b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧  b^{5, 223}_0 ∧ -p_1115) -> ( b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0)
c  in CNF:
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨  b^{5, 224}_2
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨  b^{5, 224}_1
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨  p_1115 ∨ -b^{5, 224}_0
c  in DIMACS:
-9095  9096 -9097  1115  9098 0
-9095  9096 -9097  1115  9099 0
-9095  9096 -9097  1115 -9100 0

c  -2-1 --> break 
c    ( b^{5, 223}_2 ∧  b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧ -p_1115) -> break
c  in CNF:
c    -b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨  b^{5, 223}_0 ∨  p_1115 ∨ break
c  in DIMACS:
-9095 -9096  9097  1115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 223}_2 ∧ -b^{5, 223}_1 ∧ -b^{5, 223}_0 ∧ true) 
c  in CNF:
c    -b^{5, 223}_2 ∨  b^{5, 223}_1 ∨  b^{5, 223}_0 ∨ false 
c  in DIMACS:
-9095  9096  9097  0

c  3 does not represent an automaton state.
c    -(-b^{5, 223}_2 ∧  b^{5, 223}_1 ∧  b^{5, 223}_0 ∧ true) 
c  in CNF:
c     b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ false 
c  in DIMACS:
 9095 -9096 -9097  0
c  -3 does not represent an automaton state.
c    -( b^{5, 223}_2 ∧  b^{5, 223}_1 ∧  b^{5, 223}_0 ∧ true) 
c  in CNF:
c    -b^{5, 223}_2 ∨ -b^{5, 223}_1 ∨ -b^{5, 223}_0 ∨ false 
c  in DIMACS:
-9095 -9096 -9097  0

c i = 224
c  -2+1 --> -1
c    ( b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧  p_1120) -> ( b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0)
c  in CNF:
c    -b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨  b^{5, 225}_2
c    -b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_1
c    -b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨  b^{5, 225}_0
c  in DIMACS:
-9098 -9099  9100 -1120  9101 0
-9098 -9099  9100 -1120 -9102 0
-9098 -9099  9100 -1120  9103 0

c  -1+1 --> 0
c    ( b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0 ∧  p_1120) -> (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧ -b^{5, 225}_0)
c  in CNF:
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_2
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_1
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_0
c  in DIMACS:
-9098  9099 -9100 -1120 -9101 0
-9098  9099 -9100 -1120 -9102 0
-9098  9099 -9100 -1120 -9103 0

c  0+1 --> 1
c    (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧  p_1120) -> (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0)
c  in CNF:
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_2
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_1
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨  b^{5, 225}_0
c  in DIMACS:
 9098  9099  9100 -1120 -9101 0
 9098  9099  9100 -1120 -9102 0
 9098  9099  9100 -1120  9103 0

c  1+1 --> 2
c    (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0 ∧  p_1120) -> (-b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0)
c  in CNF:
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_2
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨  b^{5, 225}_1
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ -p_1120 ∨ -b^{5, 225}_0
c  in DIMACS:
 9098  9099 -9100 -1120 -9101 0
 9098  9099 -9100 -1120  9102 0
 9098  9099 -9100 -1120 -9103 0

c  2+1 --> break 
c    (-b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 9098 -9099  9100 -1120 1162 0


c  2-1 --> 1
c    (-b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧ -p_1120) -> (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0)
c  in CNF:
c     b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_2
c     b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_1
c     b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨  b^{5, 225}_0
c  in DIMACS:
 9098 -9099  9100  1120 -9101 0
 9098 -9099  9100  1120 -9102 0
 9098 -9099  9100  1120  9103 0

c  1-1 --> 0
c    (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0 ∧ -p_1120) -> (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧ -b^{5, 225}_0)
c  in CNF:
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_2
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_1
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_0
c  in DIMACS:
 9098  9099 -9100  1120 -9101 0
 9098  9099 -9100  1120 -9102 0
 9098  9099 -9100  1120 -9103 0

c  0-1 --> -1
c    (-b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧ -p_1120) -> ( b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0)
c  in CNF:
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨  b^{5, 225}_2
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_1
c     b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨  b^{5, 225}_0
c  in DIMACS:
 9098  9099  9100  1120  9101 0
 9098  9099  9100  1120 -9102 0
 9098  9099  9100  1120  9103 0

c  -1-1 --> -2
c    ( b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧  b^{5, 224}_0 ∧ -p_1120) -> ( b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0)
c  in CNF:
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨  b^{5, 225}_2
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨  b^{5, 225}_1
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨  p_1120 ∨ -b^{5, 225}_0
c  in DIMACS:
-9098  9099 -9100  1120  9101 0
-9098  9099 -9100  1120  9102 0
-9098  9099 -9100  1120 -9103 0

c  -2-1 --> break 
c    ( b^{5, 224}_2 ∧  b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨  b^{5, 224}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-9098 -9099  9100  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 224}_2 ∧ -b^{5, 224}_1 ∧ -b^{5, 224}_0 ∧ true) 
c  in CNF:
c    -b^{5, 224}_2 ∨  b^{5, 224}_1 ∨  b^{5, 224}_0 ∨ false 
c  in DIMACS:
-9098  9099  9100  0

c  3 does not represent an automaton state.
c    -(-b^{5, 224}_2 ∧  b^{5, 224}_1 ∧  b^{5, 224}_0 ∧ true) 
c  in CNF:
c     b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ false 
c  in DIMACS:
 9098 -9099 -9100  0
c  -3 does not represent an automaton state.
c    -( b^{5, 224}_2 ∧  b^{5, 224}_1 ∧  b^{5, 224}_0 ∧ true) 
c  in CNF:
c    -b^{5, 224}_2 ∨ -b^{5, 224}_1 ∨ -b^{5, 224}_0 ∨ false 
c  in DIMACS:
-9098 -9099 -9100  0

c i = 225
c  -2+1 --> -1
c    ( b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧  p_1125) -> ( b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0)
c  in CNF:
c    -b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨  b^{5, 226}_2
c    -b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_1
c    -b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨  b^{5, 226}_0
c  in DIMACS:
-9101 -9102  9103 -1125  9104 0
-9101 -9102  9103 -1125 -9105 0
-9101 -9102  9103 -1125  9106 0

c  -1+1 --> 0
c    ( b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0 ∧  p_1125) -> (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧ -b^{5, 226}_0)
c  in CNF:
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_2
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_1
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_0
c  in DIMACS:
-9101  9102 -9103 -1125 -9104 0
-9101  9102 -9103 -1125 -9105 0
-9101  9102 -9103 -1125 -9106 0

c  0+1 --> 1
c    (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧  p_1125) -> (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0)
c  in CNF:
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_2
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_1
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨  b^{5, 226}_0
c  in DIMACS:
 9101  9102  9103 -1125 -9104 0
 9101  9102  9103 -1125 -9105 0
 9101  9102  9103 -1125  9106 0

c  1+1 --> 2
c    (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0 ∧  p_1125) -> (-b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0)
c  in CNF:
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_2
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨  b^{5, 226}_1
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ -p_1125 ∨ -b^{5, 226}_0
c  in DIMACS:
 9101  9102 -9103 -1125 -9104 0
 9101  9102 -9103 -1125  9105 0
 9101  9102 -9103 -1125 -9106 0

c  2+1 --> break 
c    (-b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 9101 -9102  9103 -1125 1162 0


c  2-1 --> 1
c    (-b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧ -p_1125) -> (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0)
c  in CNF:
c     b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_2
c     b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_1
c     b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨  b^{5, 226}_0
c  in DIMACS:
 9101 -9102  9103  1125 -9104 0
 9101 -9102  9103  1125 -9105 0
 9101 -9102  9103  1125  9106 0

c  1-1 --> 0
c    (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0 ∧ -p_1125) -> (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧ -b^{5, 226}_0)
c  in CNF:
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_2
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_1
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_0
c  in DIMACS:
 9101  9102 -9103  1125 -9104 0
 9101  9102 -9103  1125 -9105 0
 9101  9102 -9103  1125 -9106 0

c  0-1 --> -1
c    (-b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧ -p_1125) -> ( b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0)
c  in CNF:
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨  b^{5, 226}_2
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_1
c     b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨  b^{5, 226}_0
c  in DIMACS:
 9101  9102  9103  1125  9104 0
 9101  9102  9103  1125 -9105 0
 9101  9102  9103  1125  9106 0

c  -1-1 --> -2
c    ( b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧  b^{5, 225}_0 ∧ -p_1125) -> ( b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0)
c  in CNF:
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨  b^{5, 226}_2
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨  b^{5, 226}_1
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨  p_1125 ∨ -b^{5, 226}_0
c  in DIMACS:
-9101  9102 -9103  1125  9104 0
-9101  9102 -9103  1125  9105 0
-9101  9102 -9103  1125 -9106 0

c  -2-1 --> break 
c    ( b^{5, 225}_2 ∧  b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨  b^{5, 225}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-9101 -9102  9103  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 225}_2 ∧ -b^{5, 225}_1 ∧ -b^{5, 225}_0 ∧ true) 
c  in CNF:
c    -b^{5, 225}_2 ∨  b^{5, 225}_1 ∨  b^{5, 225}_0 ∨ false 
c  in DIMACS:
-9101  9102  9103  0

c  3 does not represent an automaton state.
c    -(-b^{5, 225}_2 ∧  b^{5, 225}_1 ∧  b^{5, 225}_0 ∧ true) 
c  in CNF:
c     b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ false 
c  in DIMACS:
 9101 -9102 -9103  0
c  -3 does not represent an automaton state.
c    -( b^{5, 225}_2 ∧  b^{5, 225}_1 ∧  b^{5, 225}_0 ∧ true) 
c  in CNF:
c    -b^{5, 225}_2 ∨ -b^{5, 225}_1 ∨ -b^{5, 225}_0 ∨ false 
c  in DIMACS:
-9101 -9102 -9103  0

c i = 226
c  -2+1 --> -1
c    ( b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧  p_1130) -> ( b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0)
c  in CNF:
c    -b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨  b^{5, 227}_2
c    -b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_1
c    -b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨  b^{5, 227}_0
c  in DIMACS:
-9104 -9105  9106 -1130  9107 0
-9104 -9105  9106 -1130 -9108 0
-9104 -9105  9106 -1130  9109 0

c  -1+1 --> 0
c    ( b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0 ∧  p_1130) -> (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧ -b^{5, 227}_0)
c  in CNF:
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_2
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_1
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_0
c  in DIMACS:
-9104  9105 -9106 -1130 -9107 0
-9104  9105 -9106 -1130 -9108 0
-9104  9105 -9106 -1130 -9109 0

c  0+1 --> 1
c    (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧  p_1130) -> (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0)
c  in CNF:
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_2
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_1
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨  b^{5, 227}_0
c  in DIMACS:
 9104  9105  9106 -1130 -9107 0
 9104  9105  9106 -1130 -9108 0
 9104  9105  9106 -1130  9109 0

c  1+1 --> 2
c    (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0 ∧  p_1130) -> (-b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0)
c  in CNF:
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_2
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨  b^{5, 227}_1
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ -p_1130 ∨ -b^{5, 227}_0
c  in DIMACS:
 9104  9105 -9106 -1130 -9107 0
 9104  9105 -9106 -1130  9108 0
 9104  9105 -9106 -1130 -9109 0

c  2+1 --> break 
c    (-b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 9104 -9105  9106 -1130 1162 0


c  2-1 --> 1
c    (-b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧ -p_1130) -> (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0)
c  in CNF:
c     b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_2
c     b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_1
c     b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨  b^{5, 227}_0
c  in DIMACS:
 9104 -9105  9106  1130 -9107 0
 9104 -9105  9106  1130 -9108 0
 9104 -9105  9106  1130  9109 0

c  1-1 --> 0
c    (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0 ∧ -p_1130) -> (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧ -b^{5, 227}_0)
c  in CNF:
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_2
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_1
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_0
c  in DIMACS:
 9104  9105 -9106  1130 -9107 0
 9104  9105 -9106  1130 -9108 0
 9104  9105 -9106  1130 -9109 0

c  0-1 --> -1
c    (-b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧ -p_1130) -> ( b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0)
c  in CNF:
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨  b^{5, 227}_2
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_1
c     b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨  b^{5, 227}_0
c  in DIMACS:
 9104  9105  9106  1130  9107 0
 9104  9105  9106  1130 -9108 0
 9104  9105  9106  1130  9109 0

c  -1-1 --> -2
c    ( b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧  b^{5, 226}_0 ∧ -p_1130) -> ( b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0)
c  in CNF:
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨  b^{5, 227}_2
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨  b^{5, 227}_1
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨  p_1130 ∨ -b^{5, 227}_0
c  in DIMACS:
-9104  9105 -9106  1130  9107 0
-9104  9105 -9106  1130  9108 0
-9104  9105 -9106  1130 -9109 0

c  -2-1 --> break 
c    ( b^{5, 226}_2 ∧  b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨  b^{5, 226}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-9104 -9105  9106  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 226}_2 ∧ -b^{5, 226}_1 ∧ -b^{5, 226}_0 ∧ true) 
c  in CNF:
c    -b^{5, 226}_2 ∨  b^{5, 226}_1 ∨  b^{5, 226}_0 ∨ false 
c  in DIMACS:
-9104  9105  9106  0

c  3 does not represent an automaton state.
c    -(-b^{5, 226}_2 ∧  b^{5, 226}_1 ∧  b^{5, 226}_0 ∧ true) 
c  in CNF:
c     b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ false 
c  in DIMACS:
 9104 -9105 -9106  0
c  -3 does not represent an automaton state.
c    -( b^{5, 226}_2 ∧  b^{5, 226}_1 ∧  b^{5, 226}_0 ∧ true) 
c  in CNF:
c    -b^{5, 226}_2 ∨ -b^{5, 226}_1 ∨ -b^{5, 226}_0 ∨ false 
c  in DIMACS:
-9104 -9105 -9106  0

c i = 227
c  -2+1 --> -1
c    ( b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧  p_1135) -> ( b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0)
c  in CNF:
c    -b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨  b^{5, 228}_2
c    -b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_1
c    -b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨  b^{5, 228}_0
c  in DIMACS:
-9107 -9108  9109 -1135  9110 0
-9107 -9108  9109 -1135 -9111 0
-9107 -9108  9109 -1135  9112 0

c  -1+1 --> 0
c    ( b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0 ∧  p_1135) -> (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧ -b^{5, 228}_0)
c  in CNF:
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_2
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_1
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_0
c  in DIMACS:
-9107  9108 -9109 -1135 -9110 0
-9107  9108 -9109 -1135 -9111 0
-9107  9108 -9109 -1135 -9112 0

c  0+1 --> 1
c    (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧  p_1135) -> (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0)
c  in CNF:
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_2
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_1
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨  b^{5, 228}_0
c  in DIMACS:
 9107  9108  9109 -1135 -9110 0
 9107  9108  9109 -1135 -9111 0
 9107  9108  9109 -1135  9112 0

c  1+1 --> 2
c    (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0 ∧  p_1135) -> (-b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0)
c  in CNF:
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_2
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨  b^{5, 228}_1
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ -p_1135 ∨ -b^{5, 228}_0
c  in DIMACS:
 9107  9108 -9109 -1135 -9110 0
 9107  9108 -9109 -1135  9111 0
 9107  9108 -9109 -1135 -9112 0

c  2+1 --> break 
c    (-b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧  p_1135) -> break
c  in CNF:
c     b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ -p_1135 ∨ break
c  in DIMACS:
 9107 -9108  9109 -1135 1162 0


c  2-1 --> 1
c    (-b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧ -p_1135) -> (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0)
c  in CNF:
c     b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_2
c     b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_1
c     b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨  b^{5, 228}_0
c  in DIMACS:
 9107 -9108  9109  1135 -9110 0
 9107 -9108  9109  1135 -9111 0
 9107 -9108  9109  1135  9112 0

c  1-1 --> 0
c    (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0 ∧ -p_1135) -> (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧ -b^{5, 228}_0)
c  in CNF:
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_2
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_1
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_0
c  in DIMACS:
 9107  9108 -9109  1135 -9110 0
 9107  9108 -9109  1135 -9111 0
 9107  9108 -9109  1135 -9112 0

c  0-1 --> -1
c    (-b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧ -p_1135) -> ( b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0)
c  in CNF:
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨  b^{5, 228}_2
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_1
c     b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨  b^{5, 228}_0
c  in DIMACS:
 9107  9108  9109  1135  9110 0
 9107  9108  9109  1135 -9111 0
 9107  9108  9109  1135  9112 0

c  -1-1 --> -2
c    ( b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧  b^{5, 227}_0 ∧ -p_1135) -> ( b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0)
c  in CNF:
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨  b^{5, 228}_2
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨  b^{5, 228}_1
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨  p_1135 ∨ -b^{5, 228}_0
c  in DIMACS:
-9107  9108 -9109  1135  9110 0
-9107  9108 -9109  1135  9111 0
-9107  9108 -9109  1135 -9112 0

c  -2-1 --> break 
c    ( b^{5, 227}_2 ∧  b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧ -p_1135) -> break
c  in CNF:
c    -b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨  b^{5, 227}_0 ∨  p_1135 ∨ break
c  in DIMACS:
-9107 -9108  9109  1135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 227}_2 ∧ -b^{5, 227}_1 ∧ -b^{5, 227}_0 ∧ true) 
c  in CNF:
c    -b^{5, 227}_2 ∨  b^{5, 227}_1 ∨  b^{5, 227}_0 ∨ false 
c  in DIMACS:
-9107  9108  9109  0

c  3 does not represent an automaton state.
c    -(-b^{5, 227}_2 ∧  b^{5, 227}_1 ∧  b^{5, 227}_0 ∧ true) 
c  in CNF:
c     b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ false 
c  in DIMACS:
 9107 -9108 -9109  0
c  -3 does not represent an automaton state.
c    -( b^{5, 227}_2 ∧  b^{5, 227}_1 ∧  b^{5, 227}_0 ∧ true) 
c  in CNF:
c    -b^{5, 227}_2 ∨ -b^{5, 227}_1 ∨ -b^{5, 227}_0 ∨ false 
c  in DIMACS:
-9107 -9108 -9109  0

c i = 228
c  -2+1 --> -1
c    ( b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧  p_1140) -> ( b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0)
c  in CNF:
c    -b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨  b^{5, 229}_2
c    -b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_1
c    -b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨  b^{5, 229}_0
c  in DIMACS:
-9110 -9111  9112 -1140  9113 0
-9110 -9111  9112 -1140 -9114 0
-9110 -9111  9112 -1140  9115 0

c  -1+1 --> 0
c    ( b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0 ∧  p_1140) -> (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧ -b^{5, 229}_0)
c  in CNF:
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_2
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_1
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_0
c  in DIMACS:
-9110  9111 -9112 -1140 -9113 0
-9110  9111 -9112 -1140 -9114 0
-9110  9111 -9112 -1140 -9115 0

c  0+1 --> 1
c    (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧  p_1140) -> (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0)
c  in CNF:
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_2
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_1
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨  b^{5, 229}_0
c  in DIMACS:
 9110  9111  9112 -1140 -9113 0
 9110  9111  9112 -1140 -9114 0
 9110  9111  9112 -1140  9115 0

c  1+1 --> 2
c    (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0 ∧  p_1140) -> (-b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0)
c  in CNF:
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_2
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨  b^{5, 229}_1
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ -p_1140 ∨ -b^{5, 229}_0
c  in DIMACS:
 9110  9111 -9112 -1140 -9113 0
 9110  9111 -9112 -1140  9114 0
 9110  9111 -9112 -1140 -9115 0

c  2+1 --> break 
c    (-b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 9110 -9111  9112 -1140 1162 0


c  2-1 --> 1
c    (-b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧ -p_1140) -> (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0)
c  in CNF:
c     b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_2
c     b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_1
c     b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨  b^{5, 229}_0
c  in DIMACS:
 9110 -9111  9112  1140 -9113 0
 9110 -9111  9112  1140 -9114 0
 9110 -9111  9112  1140  9115 0

c  1-1 --> 0
c    (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0 ∧ -p_1140) -> (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧ -b^{5, 229}_0)
c  in CNF:
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_2
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_1
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_0
c  in DIMACS:
 9110  9111 -9112  1140 -9113 0
 9110  9111 -9112  1140 -9114 0
 9110  9111 -9112  1140 -9115 0

c  0-1 --> -1
c    (-b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧ -p_1140) -> ( b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0)
c  in CNF:
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨  b^{5, 229}_2
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_1
c     b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨  b^{5, 229}_0
c  in DIMACS:
 9110  9111  9112  1140  9113 0
 9110  9111  9112  1140 -9114 0
 9110  9111  9112  1140  9115 0

c  -1-1 --> -2
c    ( b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧  b^{5, 228}_0 ∧ -p_1140) -> ( b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0)
c  in CNF:
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨  b^{5, 229}_2
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨  b^{5, 229}_1
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨  p_1140 ∨ -b^{5, 229}_0
c  in DIMACS:
-9110  9111 -9112  1140  9113 0
-9110  9111 -9112  1140  9114 0
-9110  9111 -9112  1140 -9115 0

c  -2-1 --> break 
c    ( b^{5, 228}_2 ∧  b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨  b^{5, 228}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-9110 -9111  9112  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 228}_2 ∧ -b^{5, 228}_1 ∧ -b^{5, 228}_0 ∧ true) 
c  in CNF:
c    -b^{5, 228}_2 ∨  b^{5, 228}_1 ∨  b^{5, 228}_0 ∨ false 
c  in DIMACS:
-9110  9111  9112  0

c  3 does not represent an automaton state.
c    -(-b^{5, 228}_2 ∧  b^{5, 228}_1 ∧  b^{5, 228}_0 ∧ true) 
c  in CNF:
c     b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ false 
c  in DIMACS:
 9110 -9111 -9112  0
c  -3 does not represent an automaton state.
c    -( b^{5, 228}_2 ∧  b^{5, 228}_1 ∧  b^{5, 228}_0 ∧ true) 
c  in CNF:
c    -b^{5, 228}_2 ∨ -b^{5, 228}_1 ∨ -b^{5, 228}_0 ∨ false 
c  in DIMACS:
-9110 -9111 -9112  0

c i = 229
c  -2+1 --> -1
c    ( b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧  p_1145) -> ( b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0)
c  in CNF:
c    -b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨  b^{5, 230}_2
c    -b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_1
c    -b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨  b^{5, 230}_0
c  in DIMACS:
-9113 -9114  9115 -1145  9116 0
-9113 -9114  9115 -1145 -9117 0
-9113 -9114  9115 -1145  9118 0

c  -1+1 --> 0
c    ( b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0 ∧  p_1145) -> (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧ -b^{5, 230}_0)
c  in CNF:
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_2
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_1
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_0
c  in DIMACS:
-9113  9114 -9115 -1145 -9116 0
-9113  9114 -9115 -1145 -9117 0
-9113  9114 -9115 -1145 -9118 0

c  0+1 --> 1
c    (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧  p_1145) -> (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0)
c  in CNF:
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_2
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_1
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨  b^{5, 230}_0
c  in DIMACS:
 9113  9114  9115 -1145 -9116 0
 9113  9114  9115 -1145 -9117 0
 9113  9114  9115 -1145  9118 0

c  1+1 --> 2
c    (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0 ∧  p_1145) -> (-b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0)
c  in CNF:
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_2
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨  b^{5, 230}_1
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ -p_1145 ∨ -b^{5, 230}_0
c  in DIMACS:
 9113  9114 -9115 -1145 -9116 0
 9113  9114 -9115 -1145  9117 0
 9113  9114 -9115 -1145 -9118 0

c  2+1 --> break 
c    (-b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧  p_1145) -> break
c  in CNF:
c     b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ -p_1145 ∨ break
c  in DIMACS:
 9113 -9114  9115 -1145 1162 0


c  2-1 --> 1
c    (-b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧ -p_1145) -> (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0)
c  in CNF:
c     b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_2
c     b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_1
c     b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨  b^{5, 230}_0
c  in DIMACS:
 9113 -9114  9115  1145 -9116 0
 9113 -9114  9115  1145 -9117 0
 9113 -9114  9115  1145  9118 0

c  1-1 --> 0
c    (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0 ∧ -p_1145) -> (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧ -b^{5, 230}_0)
c  in CNF:
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_2
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_1
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_0
c  in DIMACS:
 9113  9114 -9115  1145 -9116 0
 9113  9114 -9115  1145 -9117 0
 9113  9114 -9115  1145 -9118 0

c  0-1 --> -1
c    (-b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧ -p_1145) -> ( b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0)
c  in CNF:
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨  b^{5, 230}_2
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_1
c     b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨  b^{5, 230}_0
c  in DIMACS:
 9113  9114  9115  1145  9116 0
 9113  9114  9115  1145 -9117 0
 9113  9114  9115  1145  9118 0

c  -1-1 --> -2
c    ( b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧  b^{5, 229}_0 ∧ -p_1145) -> ( b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0)
c  in CNF:
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨  b^{5, 230}_2
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨  b^{5, 230}_1
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨  p_1145 ∨ -b^{5, 230}_0
c  in DIMACS:
-9113  9114 -9115  1145  9116 0
-9113  9114 -9115  1145  9117 0
-9113  9114 -9115  1145 -9118 0

c  -2-1 --> break 
c    ( b^{5, 229}_2 ∧  b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧ -p_1145) -> break
c  in CNF:
c    -b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨  b^{5, 229}_0 ∨  p_1145 ∨ break
c  in DIMACS:
-9113 -9114  9115  1145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 229}_2 ∧ -b^{5, 229}_1 ∧ -b^{5, 229}_0 ∧ true) 
c  in CNF:
c    -b^{5, 229}_2 ∨  b^{5, 229}_1 ∨  b^{5, 229}_0 ∨ false 
c  in DIMACS:
-9113  9114  9115  0

c  3 does not represent an automaton state.
c    -(-b^{5, 229}_2 ∧  b^{5, 229}_1 ∧  b^{5, 229}_0 ∧ true) 
c  in CNF:
c     b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ false 
c  in DIMACS:
 9113 -9114 -9115  0
c  -3 does not represent an automaton state.
c    -( b^{5, 229}_2 ∧  b^{5, 229}_1 ∧  b^{5, 229}_0 ∧ true) 
c  in CNF:
c    -b^{5, 229}_2 ∨ -b^{5, 229}_1 ∨ -b^{5, 229}_0 ∨ false 
c  in DIMACS:
-9113 -9114 -9115  0

c i = 230
c  -2+1 --> -1
c    ( b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧  p_1150) -> ( b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0)
c  in CNF:
c    -b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨  b^{5, 231}_2
c    -b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_1
c    -b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨  b^{5, 231}_0
c  in DIMACS:
-9116 -9117  9118 -1150  9119 0
-9116 -9117  9118 -1150 -9120 0
-9116 -9117  9118 -1150  9121 0

c  -1+1 --> 0
c    ( b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0 ∧  p_1150) -> (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧ -b^{5, 231}_0)
c  in CNF:
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_2
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_1
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_0
c  in DIMACS:
-9116  9117 -9118 -1150 -9119 0
-9116  9117 -9118 -1150 -9120 0
-9116  9117 -9118 -1150 -9121 0

c  0+1 --> 1
c    (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧  p_1150) -> (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0)
c  in CNF:
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_2
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_1
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨  b^{5, 231}_0
c  in DIMACS:
 9116  9117  9118 -1150 -9119 0
 9116  9117  9118 -1150 -9120 0
 9116  9117  9118 -1150  9121 0

c  1+1 --> 2
c    (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0 ∧  p_1150) -> (-b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0)
c  in CNF:
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_2
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨  b^{5, 231}_1
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ -p_1150 ∨ -b^{5, 231}_0
c  in DIMACS:
 9116  9117 -9118 -1150 -9119 0
 9116  9117 -9118 -1150  9120 0
 9116  9117 -9118 -1150 -9121 0

c  2+1 --> break 
c    (-b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 9116 -9117  9118 -1150 1162 0


c  2-1 --> 1
c    (-b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧ -p_1150) -> (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0)
c  in CNF:
c     b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_2
c     b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_1
c     b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨  b^{5, 231}_0
c  in DIMACS:
 9116 -9117  9118  1150 -9119 0
 9116 -9117  9118  1150 -9120 0
 9116 -9117  9118  1150  9121 0

c  1-1 --> 0
c    (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0 ∧ -p_1150) -> (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧ -b^{5, 231}_0)
c  in CNF:
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_2
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_1
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_0
c  in DIMACS:
 9116  9117 -9118  1150 -9119 0
 9116  9117 -9118  1150 -9120 0
 9116  9117 -9118  1150 -9121 0

c  0-1 --> -1
c    (-b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧ -p_1150) -> ( b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0)
c  in CNF:
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨  b^{5, 231}_2
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_1
c     b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨  b^{5, 231}_0
c  in DIMACS:
 9116  9117  9118  1150  9119 0
 9116  9117  9118  1150 -9120 0
 9116  9117  9118  1150  9121 0

c  -1-1 --> -2
c    ( b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧  b^{5, 230}_0 ∧ -p_1150) -> ( b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0)
c  in CNF:
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨  b^{5, 231}_2
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨  b^{5, 231}_1
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨  p_1150 ∨ -b^{5, 231}_0
c  in DIMACS:
-9116  9117 -9118  1150  9119 0
-9116  9117 -9118  1150  9120 0
-9116  9117 -9118  1150 -9121 0

c  -2-1 --> break 
c    ( b^{5, 230}_2 ∧  b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨  b^{5, 230}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-9116 -9117  9118  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 230}_2 ∧ -b^{5, 230}_1 ∧ -b^{5, 230}_0 ∧ true) 
c  in CNF:
c    -b^{5, 230}_2 ∨  b^{5, 230}_1 ∨  b^{5, 230}_0 ∨ false 
c  in DIMACS:
-9116  9117  9118  0

c  3 does not represent an automaton state.
c    -(-b^{5, 230}_2 ∧  b^{5, 230}_1 ∧  b^{5, 230}_0 ∧ true) 
c  in CNF:
c     b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ false 
c  in DIMACS:
 9116 -9117 -9118  0
c  -3 does not represent an automaton state.
c    -( b^{5, 230}_2 ∧  b^{5, 230}_1 ∧  b^{5, 230}_0 ∧ true) 
c  in CNF:
c    -b^{5, 230}_2 ∨ -b^{5, 230}_1 ∨ -b^{5, 230}_0 ∨ false 
c  in DIMACS:
-9116 -9117 -9118  0

c i = 231
c  -2+1 --> -1
c    ( b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧  p_1155) -> ( b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0)
c  in CNF:
c    -b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨  b^{5, 232}_2
c    -b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_1
c    -b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨  b^{5, 232}_0
c  in DIMACS:
-9119 -9120  9121 -1155  9122 0
-9119 -9120  9121 -1155 -9123 0
-9119 -9120  9121 -1155  9124 0

c  -1+1 --> 0
c    ( b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0 ∧  p_1155) -> (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧ -b^{5, 232}_0)
c  in CNF:
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_2
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_1
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_0
c  in DIMACS:
-9119  9120 -9121 -1155 -9122 0
-9119  9120 -9121 -1155 -9123 0
-9119  9120 -9121 -1155 -9124 0

c  0+1 --> 1
c    (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧  p_1155) -> (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0)
c  in CNF:
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_2
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_1
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨  b^{5, 232}_0
c  in DIMACS:
 9119  9120  9121 -1155 -9122 0
 9119  9120  9121 -1155 -9123 0
 9119  9120  9121 -1155  9124 0

c  1+1 --> 2
c    (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0 ∧  p_1155) -> (-b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0)
c  in CNF:
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_2
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨  b^{5, 232}_1
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ -p_1155 ∨ -b^{5, 232}_0
c  in DIMACS:
 9119  9120 -9121 -1155 -9122 0
 9119  9120 -9121 -1155  9123 0
 9119  9120 -9121 -1155 -9124 0

c  2+1 --> break 
c    (-b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 9119 -9120  9121 -1155 1162 0


c  2-1 --> 1
c    (-b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧ -p_1155) -> (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0)
c  in CNF:
c     b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_2
c     b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_1
c     b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨  b^{5, 232}_0
c  in DIMACS:
 9119 -9120  9121  1155 -9122 0
 9119 -9120  9121  1155 -9123 0
 9119 -9120  9121  1155  9124 0

c  1-1 --> 0
c    (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0 ∧ -p_1155) -> (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧ -b^{5, 232}_0)
c  in CNF:
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_2
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_1
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_0
c  in DIMACS:
 9119  9120 -9121  1155 -9122 0
 9119  9120 -9121  1155 -9123 0
 9119  9120 -9121  1155 -9124 0

c  0-1 --> -1
c    (-b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧ -p_1155) -> ( b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0)
c  in CNF:
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨  b^{5, 232}_2
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_1
c     b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨  b^{5, 232}_0
c  in DIMACS:
 9119  9120  9121  1155  9122 0
 9119  9120  9121  1155 -9123 0
 9119  9120  9121  1155  9124 0

c  -1-1 --> -2
c    ( b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧  b^{5, 231}_0 ∧ -p_1155) -> ( b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0)
c  in CNF:
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨  b^{5, 232}_2
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨  b^{5, 232}_1
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨  p_1155 ∨ -b^{5, 232}_0
c  in DIMACS:
-9119  9120 -9121  1155  9122 0
-9119  9120 -9121  1155  9123 0
-9119  9120 -9121  1155 -9124 0

c  -2-1 --> break 
c    ( b^{5, 231}_2 ∧  b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨  b^{5, 231}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-9119 -9120  9121  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 231}_2 ∧ -b^{5, 231}_1 ∧ -b^{5, 231}_0 ∧ true) 
c  in CNF:
c    -b^{5, 231}_2 ∨  b^{5, 231}_1 ∨  b^{5, 231}_0 ∨ false 
c  in DIMACS:
-9119  9120  9121  0

c  3 does not represent an automaton state.
c    -(-b^{5, 231}_2 ∧  b^{5, 231}_1 ∧  b^{5, 231}_0 ∧ true) 
c  in CNF:
c     b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ false 
c  in DIMACS:
 9119 -9120 -9121  0
c  -3 does not represent an automaton state.
c    -( b^{5, 231}_2 ∧  b^{5, 231}_1 ∧  b^{5, 231}_0 ∧ true) 
c  in CNF:
c    -b^{5, 231}_2 ∨ -b^{5, 231}_1 ∨ -b^{5, 231}_0 ∨ false 
c  in DIMACS:
-9119 -9120 -9121  0

c i = 232
c  -2+1 --> -1
c    ( b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧  p_1160) -> ( b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧  b^{5, 233}_0)
c  in CNF:
c    -b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨  b^{5, 233}_2
c    -b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_1
c    -b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨  b^{5, 233}_0
c  in DIMACS:
-9122 -9123  9124 -1160  9125 0
-9122 -9123  9124 -1160 -9126 0
-9122 -9123  9124 -1160  9127 0

c  -1+1 --> 0
c    ( b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0 ∧  p_1160) -> (-b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧ -b^{5, 233}_0)
c  in CNF:
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_2
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_1
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_0
c  in DIMACS:
-9122  9123 -9124 -1160 -9125 0
-9122  9123 -9124 -1160 -9126 0
-9122  9123 -9124 -1160 -9127 0

c  0+1 --> 1
c    (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧  p_1160) -> (-b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧  b^{5, 233}_0)
c  in CNF:
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_2
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_1
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨  b^{5, 233}_0
c  in DIMACS:
 9122  9123  9124 -1160 -9125 0
 9122  9123  9124 -1160 -9126 0
 9122  9123  9124 -1160  9127 0

c  1+1 --> 2
c    (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0 ∧  p_1160) -> (-b^{5, 233}_2 ∧  b^{5, 233}_1 ∧ -b^{5, 233}_0)
c  in CNF:
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_2
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨  b^{5, 233}_1
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ -p_1160 ∨ -b^{5, 233}_0
c  in DIMACS:
 9122  9123 -9124 -1160 -9125 0
 9122  9123 -9124 -1160  9126 0
 9122  9123 -9124 -1160 -9127 0

c  2+1 --> break 
c    (-b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 9122 -9123  9124 -1160 1162 0


c  2-1 --> 1
c    (-b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧ -p_1160) -> (-b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧  b^{5, 233}_0)
c  in CNF:
c     b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_2
c     b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_1
c     b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨  b^{5, 233}_0
c  in DIMACS:
 9122 -9123  9124  1160 -9125 0
 9122 -9123  9124  1160 -9126 0
 9122 -9123  9124  1160  9127 0

c  1-1 --> 0
c    (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0 ∧ -p_1160) -> (-b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧ -b^{5, 233}_0)
c  in CNF:
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_2
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_1
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_0
c  in DIMACS:
 9122  9123 -9124  1160 -9125 0
 9122  9123 -9124  1160 -9126 0
 9122  9123 -9124  1160 -9127 0

c  0-1 --> -1
c    (-b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧ -p_1160) -> ( b^{5, 233}_2 ∧ -b^{5, 233}_1 ∧  b^{5, 233}_0)
c  in CNF:
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨  b^{5, 233}_2
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_1
c     b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨  b^{5, 233}_0
c  in DIMACS:
 9122  9123  9124  1160  9125 0
 9122  9123  9124  1160 -9126 0
 9122  9123  9124  1160  9127 0

c  -1-1 --> -2
c    ( b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧  b^{5, 232}_0 ∧ -p_1160) -> ( b^{5, 233}_2 ∧  b^{5, 233}_1 ∧ -b^{5, 233}_0)
c  in CNF:
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨  b^{5, 233}_2
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨  b^{5, 233}_1
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨  p_1160 ∨ -b^{5, 233}_0
c  in DIMACS:
-9122  9123 -9124  1160  9125 0
-9122  9123 -9124  1160  9126 0
-9122  9123 -9124  1160 -9127 0

c  -2-1 --> break 
c    ( b^{5, 232}_2 ∧  b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨  b^{5, 232}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-9122 -9123  9124  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{5, 232}_2 ∧ -b^{5, 232}_1 ∧ -b^{5, 232}_0 ∧ true) 
c  in CNF:
c    -b^{5, 232}_2 ∨  b^{5, 232}_1 ∨  b^{5, 232}_0 ∨ false 
c  in DIMACS:
-9122  9123  9124  0

c  3 does not represent an automaton state.
c    -(-b^{5, 232}_2 ∧  b^{5, 232}_1 ∧  b^{5, 232}_0 ∧ true) 
c  in CNF:
c     b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ false 
c  in DIMACS:
 9122 -9123 -9124  0
c  -3 does not represent an automaton state.
c    -( b^{5, 232}_2 ∧  b^{5, 232}_1 ∧  b^{5, 232}_0 ∧ true) 
c  in CNF:
c    -b^{5, 232}_2 ∨ -b^{5, 232}_1 ∨ -b^{5, 232}_0 ∨ false 
c  in DIMACS:
-9122 -9123 -9124  0

c INIT for k = 6
c    -b^{6, 1}_2
c    -b^{6, 1}_1
c    -b^{6, 1}_0
c  in DIMACS:
-9128 0
-9129 0
-9130 0

c Transitions for k = 6
c i = 1
c  -2+1 --> -1
c    ( b^{6, 1}_2 ∧  b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧  p_6) -> ( b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0)
c  in CNF:
c    -b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨  b^{6, 2}_2
c    -b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_1
c    -b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨  b^{6, 2}_0
c  in DIMACS:
-9128 -9129  9130 -6  9131 0
-9128 -9129  9130 -6 -9132 0
-9128 -9129  9130 -6  9133 0

c  -1+1 --> 0
c    ( b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧  b^{6, 1}_0 ∧  p_6) -> (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧ -b^{6, 2}_0)
c  in CNF:
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_2
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_1
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_0
c  in DIMACS:
-9128  9129 -9130 -6 -9131 0
-9128  9129 -9130 -6 -9132 0
-9128  9129 -9130 -6 -9133 0

c  0+1 --> 1
c    (-b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧  p_6) -> (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0)
c  in CNF:
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_2
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_1
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨  b^{6, 2}_0
c  in DIMACS:
 9128  9129  9130 -6 -9131 0
 9128  9129  9130 -6 -9132 0
 9128  9129  9130 -6  9133 0

c  1+1 --> 2
c    (-b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧  b^{6, 1}_0 ∧  p_6) -> (-b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0)
c  in CNF:
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_2
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨  b^{6, 2}_1
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ -p_6 ∨ -b^{6, 2}_0
c  in DIMACS:
 9128  9129 -9130 -6 -9131 0
 9128  9129 -9130 -6  9132 0
 9128  9129 -9130 -6 -9133 0

c  2+1 --> break 
c    (-b^{6, 1}_2 ∧  b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧  p_6) -> break
c  in CNF:
c     b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ -p_6 ∨ break
c  in DIMACS:
 9128 -9129  9130 -6 1162 0


c  2-1 --> 1
c    (-b^{6, 1}_2 ∧  b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧ -p_6) -> (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0)
c  in CNF:
c     b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_2
c     b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_1
c     b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨  b^{6, 2}_0
c  in DIMACS:
 9128 -9129  9130  6 -9131 0
 9128 -9129  9130  6 -9132 0
 9128 -9129  9130  6  9133 0

c  1-1 --> 0
c    (-b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧  b^{6, 1}_0 ∧ -p_6) -> (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧ -b^{6, 2}_0)
c  in CNF:
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_2
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_1
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_0
c  in DIMACS:
 9128  9129 -9130  6 -9131 0
 9128  9129 -9130  6 -9132 0
 9128  9129 -9130  6 -9133 0

c  0-1 --> -1
c    (-b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧ -p_6) -> ( b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0)
c  in CNF:
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨  b^{6, 2}_2
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_1
c     b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨  b^{6, 2}_0
c  in DIMACS:
 9128  9129  9130  6  9131 0
 9128  9129  9130  6 -9132 0
 9128  9129  9130  6  9133 0

c  -1-1 --> -2
c    ( b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧  b^{6, 1}_0 ∧ -p_6) -> ( b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0)
c  in CNF:
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨  b^{6, 2}_2
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨  b^{6, 2}_1
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨  p_6 ∨ -b^{6, 2}_0
c  in DIMACS:
-9128  9129 -9130  6  9131 0
-9128  9129 -9130  6  9132 0
-9128  9129 -9130  6 -9133 0

c  -2-1 --> break 
c    ( b^{6, 1}_2 ∧  b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧ -p_6) -> break
c  in CNF:
c    -b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨  b^{6, 1}_0 ∨  p_6 ∨ break
c  in DIMACS:
-9128 -9129  9130  6 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 1}_2 ∧ -b^{6, 1}_1 ∧ -b^{6, 1}_0 ∧ true) 
c  in CNF:
c    -b^{6, 1}_2 ∨  b^{6, 1}_1 ∨  b^{6, 1}_0 ∨ false 
c  in DIMACS:
-9128  9129  9130  0

c  3 does not represent an automaton state.
c    -(-b^{6, 1}_2 ∧  b^{6, 1}_1 ∧  b^{6, 1}_0 ∧ true) 
c  in CNF:
c     b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ false 
c  in DIMACS:
 9128 -9129 -9130  0
c  -3 does not represent an automaton state.
c    -( b^{6, 1}_2 ∧  b^{6, 1}_1 ∧  b^{6, 1}_0 ∧ true) 
c  in CNF:
c    -b^{6, 1}_2 ∨ -b^{6, 1}_1 ∨ -b^{6, 1}_0 ∨ false 
c  in DIMACS:
-9128 -9129 -9130  0

c i = 2
c  -2+1 --> -1
c    ( b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧  p_12) -> ( b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0)
c  in CNF:
c    -b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨  b^{6, 3}_2
c    -b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_1
c    -b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨  b^{6, 3}_0
c  in DIMACS:
-9131 -9132  9133 -12  9134 0
-9131 -9132  9133 -12 -9135 0
-9131 -9132  9133 -12  9136 0

c  -1+1 --> 0
c    ( b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0 ∧  p_12) -> (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧ -b^{6, 3}_0)
c  in CNF:
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_2
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_1
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_0
c  in DIMACS:
-9131  9132 -9133 -12 -9134 0
-9131  9132 -9133 -12 -9135 0
-9131  9132 -9133 -12 -9136 0

c  0+1 --> 1
c    (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧  p_12) -> (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0)
c  in CNF:
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_2
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_1
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨  b^{6, 3}_0
c  in DIMACS:
 9131  9132  9133 -12 -9134 0
 9131  9132  9133 -12 -9135 0
 9131  9132  9133 -12  9136 0

c  1+1 --> 2
c    (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0 ∧  p_12) -> (-b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0)
c  in CNF:
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_2
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨  b^{6, 3}_1
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ -p_12 ∨ -b^{6, 3}_0
c  in DIMACS:
 9131  9132 -9133 -12 -9134 0
 9131  9132 -9133 -12  9135 0
 9131  9132 -9133 -12 -9136 0

c  2+1 --> break 
c    (-b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧  p_12) -> break
c  in CNF:
c     b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 9131 -9132  9133 -12 1162 0


c  2-1 --> 1
c    (-b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧ -p_12) -> (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0)
c  in CNF:
c     b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_2
c     b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_1
c     b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨  b^{6, 3}_0
c  in DIMACS:
 9131 -9132  9133  12 -9134 0
 9131 -9132  9133  12 -9135 0
 9131 -9132  9133  12  9136 0

c  1-1 --> 0
c    (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0 ∧ -p_12) -> (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧ -b^{6, 3}_0)
c  in CNF:
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_2
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_1
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_0
c  in DIMACS:
 9131  9132 -9133  12 -9134 0
 9131  9132 -9133  12 -9135 0
 9131  9132 -9133  12 -9136 0

c  0-1 --> -1
c    (-b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧ -p_12) -> ( b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0)
c  in CNF:
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨  b^{6, 3}_2
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_1
c     b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨  b^{6, 3}_0
c  in DIMACS:
 9131  9132  9133  12  9134 0
 9131  9132  9133  12 -9135 0
 9131  9132  9133  12  9136 0

c  -1-1 --> -2
c    ( b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧  b^{6, 2}_0 ∧ -p_12) -> ( b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0)
c  in CNF:
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨  b^{6, 3}_2
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨  b^{6, 3}_1
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨  p_12 ∨ -b^{6, 3}_0
c  in DIMACS:
-9131  9132 -9133  12  9134 0
-9131  9132 -9133  12  9135 0
-9131  9132 -9133  12 -9136 0

c  -2-1 --> break 
c    ( b^{6, 2}_2 ∧  b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨  b^{6, 2}_0 ∨  p_12 ∨ break
c  in DIMACS:
-9131 -9132  9133  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 2}_2 ∧ -b^{6, 2}_1 ∧ -b^{6, 2}_0 ∧ true) 
c  in CNF:
c    -b^{6, 2}_2 ∨  b^{6, 2}_1 ∨  b^{6, 2}_0 ∨ false 
c  in DIMACS:
-9131  9132  9133  0

c  3 does not represent an automaton state.
c    -(-b^{6, 2}_2 ∧  b^{6, 2}_1 ∧  b^{6, 2}_0 ∧ true) 
c  in CNF:
c     b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ false 
c  in DIMACS:
 9131 -9132 -9133  0
c  -3 does not represent an automaton state.
c    -( b^{6, 2}_2 ∧  b^{6, 2}_1 ∧  b^{6, 2}_0 ∧ true) 
c  in CNF:
c    -b^{6, 2}_2 ∨ -b^{6, 2}_1 ∨ -b^{6, 2}_0 ∨ false 
c  in DIMACS:
-9131 -9132 -9133  0

c i = 3
c  -2+1 --> -1
c    ( b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧  p_18) -> ( b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0)
c  in CNF:
c    -b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨  b^{6, 4}_2
c    -b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_1
c    -b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨  b^{6, 4}_0
c  in DIMACS:
-9134 -9135  9136 -18  9137 0
-9134 -9135  9136 -18 -9138 0
-9134 -9135  9136 -18  9139 0

c  -1+1 --> 0
c    ( b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0 ∧  p_18) -> (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧ -b^{6, 4}_0)
c  in CNF:
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_2
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_1
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_0
c  in DIMACS:
-9134  9135 -9136 -18 -9137 0
-9134  9135 -9136 -18 -9138 0
-9134  9135 -9136 -18 -9139 0

c  0+1 --> 1
c    (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧  p_18) -> (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0)
c  in CNF:
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_2
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_1
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨  b^{6, 4}_0
c  in DIMACS:
 9134  9135  9136 -18 -9137 0
 9134  9135  9136 -18 -9138 0
 9134  9135  9136 -18  9139 0

c  1+1 --> 2
c    (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0 ∧  p_18) -> (-b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0)
c  in CNF:
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_2
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨  b^{6, 4}_1
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ -p_18 ∨ -b^{6, 4}_0
c  in DIMACS:
 9134  9135 -9136 -18 -9137 0
 9134  9135 -9136 -18  9138 0
 9134  9135 -9136 -18 -9139 0

c  2+1 --> break 
c    (-b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧  p_18) -> break
c  in CNF:
c     b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 9134 -9135  9136 -18 1162 0


c  2-1 --> 1
c    (-b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧ -p_18) -> (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0)
c  in CNF:
c     b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_2
c     b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_1
c     b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨  b^{6, 4}_0
c  in DIMACS:
 9134 -9135  9136  18 -9137 0
 9134 -9135  9136  18 -9138 0
 9134 -9135  9136  18  9139 0

c  1-1 --> 0
c    (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0 ∧ -p_18) -> (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧ -b^{6, 4}_0)
c  in CNF:
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_2
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_1
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_0
c  in DIMACS:
 9134  9135 -9136  18 -9137 0
 9134  9135 -9136  18 -9138 0
 9134  9135 -9136  18 -9139 0

c  0-1 --> -1
c    (-b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧ -p_18) -> ( b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0)
c  in CNF:
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨  b^{6, 4}_2
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_1
c     b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨  b^{6, 4}_0
c  in DIMACS:
 9134  9135  9136  18  9137 0
 9134  9135  9136  18 -9138 0
 9134  9135  9136  18  9139 0

c  -1-1 --> -2
c    ( b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧  b^{6, 3}_0 ∧ -p_18) -> ( b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0)
c  in CNF:
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨  b^{6, 4}_2
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨  b^{6, 4}_1
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨  p_18 ∨ -b^{6, 4}_0
c  in DIMACS:
-9134  9135 -9136  18  9137 0
-9134  9135 -9136  18  9138 0
-9134  9135 -9136  18 -9139 0

c  -2-1 --> break 
c    ( b^{6, 3}_2 ∧  b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨  b^{6, 3}_0 ∨  p_18 ∨ break
c  in DIMACS:
-9134 -9135  9136  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 3}_2 ∧ -b^{6, 3}_1 ∧ -b^{6, 3}_0 ∧ true) 
c  in CNF:
c    -b^{6, 3}_2 ∨  b^{6, 3}_1 ∨  b^{6, 3}_0 ∨ false 
c  in DIMACS:
-9134  9135  9136  0

c  3 does not represent an automaton state.
c    -(-b^{6, 3}_2 ∧  b^{6, 3}_1 ∧  b^{6, 3}_0 ∧ true) 
c  in CNF:
c     b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ false 
c  in DIMACS:
 9134 -9135 -9136  0
c  -3 does not represent an automaton state.
c    -( b^{6, 3}_2 ∧  b^{6, 3}_1 ∧  b^{6, 3}_0 ∧ true) 
c  in CNF:
c    -b^{6, 3}_2 ∨ -b^{6, 3}_1 ∨ -b^{6, 3}_0 ∨ false 
c  in DIMACS:
-9134 -9135 -9136  0

c i = 4
c  -2+1 --> -1
c    ( b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧  p_24) -> ( b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0)
c  in CNF:
c    -b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨  b^{6, 5}_2
c    -b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_1
c    -b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨  b^{6, 5}_0
c  in DIMACS:
-9137 -9138  9139 -24  9140 0
-9137 -9138  9139 -24 -9141 0
-9137 -9138  9139 -24  9142 0

c  -1+1 --> 0
c    ( b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0 ∧  p_24) -> (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧ -b^{6, 5}_0)
c  in CNF:
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_2
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_1
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_0
c  in DIMACS:
-9137  9138 -9139 -24 -9140 0
-9137  9138 -9139 -24 -9141 0
-9137  9138 -9139 -24 -9142 0

c  0+1 --> 1
c    (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧  p_24) -> (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0)
c  in CNF:
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_2
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_1
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨  b^{6, 5}_0
c  in DIMACS:
 9137  9138  9139 -24 -9140 0
 9137  9138  9139 -24 -9141 0
 9137  9138  9139 -24  9142 0

c  1+1 --> 2
c    (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0 ∧  p_24) -> (-b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0)
c  in CNF:
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_2
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨  b^{6, 5}_1
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ -p_24 ∨ -b^{6, 5}_0
c  in DIMACS:
 9137  9138 -9139 -24 -9140 0
 9137  9138 -9139 -24  9141 0
 9137  9138 -9139 -24 -9142 0

c  2+1 --> break 
c    (-b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧  p_24) -> break
c  in CNF:
c     b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 9137 -9138  9139 -24 1162 0


c  2-1 --> 1
c    (-b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧ -p_24) -> (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0)
c  in CNF:
c     b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_2
c     b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_1
c     b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨  b^{6, 5}_0
c  in DIMACS:
 9137 -9138  9139  24 -9140 0
 9137 -9138  9139  24 -9141 0
 9137 -9138  9139  24  9142 0

c  1-1 --> 0
c    (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0 ∧ -p_24) -> (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧ -b^{6, 5}_0)
c  in CNF:
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_2
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_1
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_0
c  in DIMACS:
 9137  9138 -9139  24 -9140 0
 9137  9138 -9139  24 -9141 0
 9137  9138 -9139  24 -9142 0

c  0-1 --> -1
c    (-b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧ -p_24) -> ( b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0)
c  in CNF:
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨  b^{6, 5}_2
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_1
c     b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨  b^{6, 5}_0
c  in DIMACS:
 9137  9138  9139  24  9140 0
 9137  9138  9139  24 -9141 0
 9137  9138  9139  24  9142 0

c  -1-1 --> -2
c    ( b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧  b^{6, 4}_0 ∧ -p_24) -> ( b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0)
c  in CNF:
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨  b^{6, 5}_2
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨  b^{6, 5}_1
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨  p_24 ∨ -b^{6, 5}_0
c  in DIMACS:
-9137  9138 -9139  24  9140 0
-9137  9138 -9139  24  9141 0
-9137  9138 -9139  24 -9142 0

c  -2-1 --> break 
c    ( b^{6, 4}_2 ∧  b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨  b^{6, 4}_0 ∨  p_24 ∨ break
c  in DIMACS:
-9137 -9138  9139  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 4}_2 ∧ -b^{6, 4}_1 ∧ -b^{6, 4}_0 ∧ true) 
c  in CNF:
c    -b^{6, 4}_2 ∨  b^{6, 4}_1 ∨  b^{6, 4}_0 ∨ false 
c  in DIMACS:
-9137  9138  9139  0

c  3 does not represent an automaton state.
c    -(-b^{6, 4}_2 ∧  b^{6, 4}_1 ∧  b^{6, 4}_0 ∧ true) 
c  in CNF:
c     b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ false 
c  in DIMACS:
 9137 -9138 -9139  0
c  -3 does not represent an automaton state.
c    -( b^{6, 4}_2 ∧  b^{6, 4}_1 ∧  b^{6, 4}_0 ∧ true) 
c  in CNF:
c    -b^{6, 4}_2 ∨ -b^{6, 4}_1 ∨ -b^{6, 4}_0 ∨ false 
c  in DIMACS:
-9137 -9138 -9139  0

c i = 5
c  -2+1 --> -1
c    ( b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧  p_30) -> ( b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0)
c  in CNF:
c    -b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨  b^{6, 6}_2
c    -b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_1
c    -b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨  b^{6, 6}_0
c  in DIMACS:
-9140 -9141  9142 -30  9143 0
-9140 -9141  9142 -30 -9144 0
-9140 -9141  9142 -30  9145 0

c  -1+1 --> 0
c    ( b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0 ∧  p_30) -> (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧ -b^{6, 6}_0)
c  in CNF:
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_2
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_1
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_0
c  in DIMACS:
-9140  9141 -9142 -30 -9143 0
-9140  9141 -9142 -30 -9144 0
-9140  9141 -9142 -30 -9145 0

c  0+1 --> 1
c    (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧  p_30) -> (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0)
c  in CNF:
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_2
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_1
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨  b^{6, 6}_0
c  in DIMACS:
 9140  9141  9142 -30 -9143 0
 9140  9141  9142 -30 -9144 0
 9140  9141  9142 -30  9145 0

c  1+1 --> 2
c    (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0 ∧  p_30) -> (-b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0)
c  in CNF:
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_2
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨  b^{6, 6}_1
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ -p_30 ∨ -b^{6, 6}_0
c  in DIMACS:
 9140  9141 -9142 -30 -9143 0
 9140  9141 -9142 -30  9144 0
 9140  9141 -9142 -30 -9145 0

c  2+1 --> break 
c    (-b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧  p_30) -> break
c  in CNF:
c     b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 9140 -9141  9142 -30 1162 0


c  2-1 --> 1
c    (-b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧ -p_30) -> (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0)
c  in CNF:
c     b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_2
c     b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_1
c     b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨  b^{6, 6}_0
c  in DIMACS:
 9140 -9141  9142  30 -9143 0
 9140 -9141  9142  30 -9144 0
 9140 -9141  9142  30  9145 0

c  1-1 --> 0
c    (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0 ∧ -p_30) -> (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧ -b^{6, 6}_0)
c  in CNF:
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_2
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_1
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_0
c  in DIMACS:
 9140  9141 -9142  30 -9143 0
 9140  9141 -9142  30 -9144 0
 9140  9141 -9142  30 -9145 0

c  0-1 --> -1
c    (-b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧ -p_30) -> ( b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0)
c  in CNF:
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨  b^{6, 6}_2
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_1
c     b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨  b^{6, 6}_0
c  in DIMACS:
 9140  9141  9142  30  9143 0
 9140  9141  9142  30 -9144 0
 9140  9141  9142  30  9145 0

c  -1-1 --> -2
c    ( b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧  b^{6, 5}_0 ∧ -p_30) -> ( b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0)
c  in CNF:
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨  b^{6, 6}_2
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨  b^{6, 6}_1
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨  p_30 ∨ -b^{6, 6}_0
c  in DIMACS:
-9140  9141 -9142  30  9143 0
-9140  9141 -9142  30  9144 0
-9140  9141 -9142  30 -9145 0

c  -2-1 --> break 
c    ( b^{6, 5}_2 ∧  b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨  b^{6, 5}_0 ∨  p_30 ∨ break
c  in DIMACS:
-9140 -9141  9142  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 5}_2 ∧ -b^{6, 5}_1 ∧ -b^{6, 5}_0 ∧ true) 
c  in CNF:
c    -b^{6, 5}_2 ∨  b^{6, 5}_1 ∨  b^{6, 5}_0 ∨ false 
c  in DIMACS:
-9140  9141  9142  0

c  3 does not represent an automaton state.
c    -(-b^{6, 5}_2 ∧  b^{6, 5}_1 ∧  b^{6, 5}_0 ∧ true) 
c  in CNF:
c     b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ false 
c  in DIMACS:
 9140 -9141 -9142  0
c  -3 does not represent an automaton state.
c    -( b^{6, 5}_2 ∧  b^{6, 5}_1 ∧  b^{6, 5}_0 ∧ true) 
c  in CNF:
c    -b^{6, 5}_2 ∨ -b^{6, 5}_1 ∨ -b^{6, 5}_0 ∨ false 
c  in DIMACS:
-9140 -9141 -9142  0

c i = 6
c  -2+1 --> -1
c    ( b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧  p_36) -> ( b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0)
c  in CNF:
c    -b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨  b^{6, 7}_2
c    -b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_1
c    -b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨  b^{6, 7}_0
c  in DIMACS:
-9143 -9144  9145 -36  9146 0
-9143 -9144  9145 -36 -9147 0
-9143 -9144  9145 -36  9148 0

c  -1+1 --> 0
c    ( b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0 ∧  p_36) -> (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧ -b^{6, 7}_0)
c  in CNF:
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_2
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_1
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_0
c  in DIMACS:
-9143  9144 -9145 -36 -9146 0
-9143  9144 -9145 -36 -9147 0
-9143  9144 -9145 -36 -9148 0

c  0+1 --> 1
c    (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧  p_36) -> (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0)
c  in CNF:
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_2
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_1
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨  b^{6, 7}_0
c  in DIMACS:
 9143  9144  9145 -36 -9146 0
 9143  9144  9145 -36 -9147 0
 9143  9144  9145 -36  9148 0

c  1+1 --> 2
c    (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0 ∧  p_36) -> (-b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0)
c  in CNF:
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_2
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨  b^{6, 7}_1
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ -p_36 ∨ -b^{6, 7}_0
c  in DIMACS:
 9143  9144 -9145 -36 -9146 0
 9143  9144 -9145 -36  9147 0
 9143  9144 -9145 -36 -9148 0

c  2+1 --> break 
c    (-b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧  p_36) -> break
c  in CNF:
c     b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 9143 -9144  9145 -36 1162 0


c  2-1 --> 1
c    (-b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧ -p_36) -> (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0)
c  in CNF:
c     b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_2
c     b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_1
c     b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨  b^{6, 7}_0
c  in DIMACS:
 9143 -9144  9145  36 -9146 0
 9143 -9144  9145  36 -9147 0
 9143 -9144  9145  36  9148 0

c  1-1 --> 0
c    (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0 ∧ -p_36) -> (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧ -b^{6, 7}_0)
c  in CNF:
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_2
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_1
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_0
c  in DIMACS:
 9143  9144 -9145  36 -9146 0
 9143  9144 -9145  36 -9147 0
 9143  9144 -9145  36 -9148 0

c  0-1 --> -1
c    (-b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧ -p_36) -> ( b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0)
c  in CNF:
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨  b^{6, 7}_2
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_1
c     b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨  b^{6, 7}_0
c  in DIMACS:
 9143  9144  9145  36  9146 0
 9143  9144  9145  36 -9147 0
 9143  9144  9145  36  9148 0

c  -1-1 --> -2
c    ( b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧  b^{6, 6}_0 ∧ -p_36) -> ( b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0)
c  in CNF:
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨  b^{6, 7}_2
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨  b^{6, 7}_1
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨  p_36 ∨ -b^{6, 7}_0
c  in DIMACS:
-9143  9144 -9145  36  9146 0
-9143  9144 -9145  36  9147 0
-9143  9144 -9145  36 -9148 0

c  -2-1 --> break 
c    ( b^{6, 6}_2 ∧  b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨  b^{6, 6}_0 ∨  p_36 ∨ break
c  in DIMACS:
-9143 -9144  9145  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 6}_2 ∧ -b^{6, 6}_1 ∧ -b^{6, 6}_0 ∧ true) 
c  in CNF:
c    -b^{6, 6}_2 ∨  b^{6, 6}_1 ∨  b^{6, 6}_0 ∨ false 
c  in DIMACS:
-9143  9144  9145  0

c  3 does not represent an automaton state.
c    -(-b^{6, 6}_2 ∧  b^{6, 6}_1 ∧  b^{6, 6}_0 ∧ true) 
c  in CNF:
c     b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ false 
c  in DIMACS:
 9143 -9144 -9145  0
c  -3 does not represent an automaton state.
c    -( b^{6, 6}_2 ∧  b^{6, 6}_1 ∧  b^{6, 6}_0 ∧ true) 
c  in CNF:
c    -b^{6, 6}_2 ∨ -b^{6, 6}_1 ∨ -b^{6, 6}_0 ∨ false 
c  in DIMACS:
-9143 -9144 -9145  0

c i = 7
c  -2+1 --> -1
c    ( b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧  p_42) -> ( b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0)
c  in CNF:
c    -b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨  b^{6, 8}_2
c    -b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_1
c    -b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨  b^{6, 8}_0
c  in DIMACS:
-9146 -9147  9148 -42  9149 0
-9146 -9147  9148 -42 -9150 0
-9146 -9147  9148 -42  9151 0

c  -1+1 --> 0
c    ( b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0 ∧  p_42) -> (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧ -b^{6, 8}_0)
c  in CNF:
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_2
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_1
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_0
c  in DIMACS:
-9146  9147 -9148 -42 -9149 0
-9146  9147 -9148 -42 -9150 0
-9146  9147 -9148 -42 -9151 0

c  0+1 --> 1
c    (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧  p_42) -> (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0)
c  in CNF:
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_2
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_1
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨  b^{6, 8}_0
c  in DIMACS:
 9146  9147  9148 -42 -9149 0
 9146  9147  9148 -42 -9150 0
 9146  9147  9148 -42  9151 0

c  1+1 --> 2
c    (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0 ∧  p_42) -> (-b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0)
c  in CNF:
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_2
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨  b^{6, 8}_1
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ -p_42 ∨ -b^{6, 8}_0
c  in DIMACS:
 9146  9147 -9148 -42 -9149 0
 9146  9147 -9148 -42  9150 0
 9146  9147 -9148 -42 -9151 0

c  2+1 --> break 
c    (-b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧  p_42) -> break
c  in CNF:
c     b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 9146 -9147  9148 -42 1162 0


c  2-1 --> 1
c    (-b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧ -p_42) -> (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0)
c  in CNF:
c     b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_2
c     b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_1
c     b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨  b^{6, 8}_0
c  in DIMACS:
 9146 -9147  9148  42 -9149 0
 9146 -9147  9148  42 -9150 0
 9146 -9147  9148  42  9151 0

c  1-1 --> 0
c    (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0 ∧ -p_42) -> (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧ -b^{6, 8}_0)
c  in CNF:
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_2
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_1
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_0
c  in DIMACS:
 9146  9147 -9148  42 -9149 0
 9146  9147 -9148  42 -9150 0
 9146  9147 -9148  42 -9151 0

c  0-1 --> -1
c    (-b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧ -p_42) -> ( b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0)
c  in CNF:
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨  b^{6, 8}_2
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_1
c     b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨  b^{6, 8}_0
c  in DIMACS:
 9146  9147  9148  42  9149 0
 9146  9147  9148  42 -9150 0
 9146  9147  9148  42  9151 0

c  -1-1 --> -2
c    ( b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧  b^{6, 7}_0 ∧ -p_42) -> ( b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0)
c  in CNF:
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨  b^{6, 8}_2
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨  b^{6, 8}_1
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨  p_42 ∨ -b^{6, 8}_0
c  in DIMACS:
-9146  9147 -9148  42  9149 0
-9146  9147 -9148  42  9150 0
-9146  9147 -9148  42 -9151 0

c  -2-1 --> break 
c    ( b^{6, 7}_2 ∧  b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨  b^{6, 7}_0 ∨  p_42 ∨ break
c  in DIMACS:
-9146 -9147  9148  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 7}_2 ∧ -b^{6, 7}_1 ∧ -b^{6, 7}_0 ∧ true) 
c  in CNF:
c    -b^{6, 7}_2 ∨  b^{6, 7}_1 ∨  b^{6, 7}_0 ∨ false 
c  in DIMACS:
-9146  9147  9148  0

c  3 does not represent an automaton state.
c    -(-b^{6, 7}_2 ∧  b^{6, 7}_1 ∧  b^{6, 7}_0 ∧ true) 
c  in CNF:
c     b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ false 
c  in DIMACS:
 9146 -9147 -9148  0
c  -3 does not represent an automaton state.
c    -( b^{6, 7}_2 ∧  b^{6, 7}_1 ∧  b^{6, 7}_0 ∧ true) 
c  in CNF:
c    -b^{6, 7}_2 ∨ -b^{6, 7}_1 ∨ -b^{6, 7}_0 ∨ false 
c  in DIMACS:
-9146 -9147 -9148  0

c i = 8
c  -2+1 --> -1
c    ( b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧  p_48) -> ( b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0)
c  in CNF:
c    -b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨  b^{6, 9}_2
c    -b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_1
c    -b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨  b^{6, 9}_0
c  in DIMACS:
-9149 -9150  9151 -48  9152 0
-9149 -9150  9151 -48 -9153 0
-9149 -9150  9151 -48  9154 0

c  -1+1 --> 0
c    ( b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0 ∧  p_48) -> (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧ -b^{6, 9}_0)
c  in CNF:
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_2
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_1
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_0
c  in DIMACS:
-9149  9150 -9151 -48 -9152 0
-9149  9150 -9151 -48 -9153 0
-9149  9150 -9151 -48 -9154 0

c  0+1 --> 1
c    (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧  p_48) -> (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0)
c  in CNF:
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_2
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_1
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨  b^{6, 9}_0
c  in DIMACS:
 9149  9150  9151 -48 -9152 0
 9149  9150  9151 -48 -9153 0
 9149  9150  9151 -48  9154 0

c  1+1 --> 2
c    (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0 ∧  p_48) -> (-b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0)
c  in CNF:
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_2
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨  b^{6, 9}_1
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ -p_48 ∨ -b^{6, 9}_0
c  in DIMACS:
 9149  9150 -9151 -48 -9152 0
 9149  9150 -9151 -48  9153 0
 9149  9150 -9151 -48 -9154 0

c  2+1 --> break 
c    (-b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧  p_48) -> break
c  in CNF:
c     b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 9149 -9150  9151 -48 1162 0


c  2-1 --> 1
c    (-b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧ -p_48) -> (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0)
c  in CNF:
c     b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_2
c     b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_1
c     b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨  b^{6, 9}_0
c  in DIMACS:
 9149 -9150  9151  48 -9152 0
 9149 -9150  9151  48 -9153 0
 9149 -9150  9151  48  9154 0

c  1-1 --> 0
c    (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0 ∧ -p_48) -> (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧ -b^{6, 9}_0)
c  in CNF:
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_2
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_1
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_0
c  in DIMACS:
 9149  9150 -9151  48 -9152 0
 9149  9150 -9151  48 -9153 0
 9149  9150 -9151  48 -9154 0

c  0-1 --> -1
c    (-b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧ -p_48) -> ( b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0)
c  in CNF:
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨  b^{6, 9}_2
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_1
c     b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨  b^{6, 9}_0
c  in DIMACS:
 9149  9150  9151  48  9152 0
 9149  9150  9151  48 -9153 0
 9149  9150  9151  48  9154 0

c  -1-1 --> -2
c    ( b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧  b^{6, 8}_0 ∧ -p_48) -> ( b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0)
c  in CNF:
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨  b^{6, 9}_2
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨  b^{6, 9}_1
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨  p_48 ∨ -b^{6, 9}_0
c  in DIMACS:
-9149  9150 -9151  48  9152 0
-9149  9150 -9151  48  9153 0
-9149  9150 -9151  48 -9154 0

c  -2-1 --> break 
c    ( b^{6, 8}_2 ∧  b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨  b^{6, 8}_0 ∨  p_48 ∨ break
c  in DIMACS:
-9149 -9150  9151  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 8}_2 ∧ -b^{6, 8}_1 ∧ -b^{6, 8}_0 ∧ true) 
c  in CNF:
c    -b^{6, 8}_2 ∨  b^{6, 8}_1 ∨  b^{6, 8}_0 ∨ false 
c  in DIMACS:
-9149  9150  9151  0

c  3 does not represent an automaton state.
c    -(-b^{6, 8}_2 ∧  b^{6, 8}_1 ∧  b^{6, 8}_0 ∧ true) 
c  in CNF:
c     b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ false 
c  in DIMACS:
 9149 -9150 -9151  0
c  -3 does not represent an automaton state.
c    -( b^{6, 8}_2 ∧  b^{6, 8}_1 ∧  b^{6, 8}_0 ∧ true) 
c  in CNF:
c    -b^{6, 8}_2 ∨ -b^{6, 8}_1 ∨ -b^{6, 8}_0 ∨ false 
c  in DIMACS:
-9149 -9150 -9151  0

c i = 9
c  -2+1 --> -1
c    ( b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧  p_54) -> ( b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0)
c  in CNF:
c    -b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨  b^{6, 10}_2
c    -b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_1
c    -b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨  b^{6, 10}_0
c  in DIMACS:
-9152 -9153  9154 -54  9155 0
-9152 -9153  9154 -54 -9156 0
-9152 -9153  9154 -54  9157 0

c  -1+1 --> 0
c    ( b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0 ∧  p_54) -> (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧ -b^{6, 10}_0)
c  in CNF:
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_2
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_1
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_0
c  in DIMACS:
-9152  9153 -9154 -54 -9155 0
-9152  9153 -9154 -54 -9156 0
-9152  9153 -9154 -54 -9157 0

c  0+1 --> 1
c    (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧  p_54) -> (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0)
c  in CNF:
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_2
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_1
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨  b^{6, 10}_0
c  in DIMACS:
 9152  9153  9154 -54 -9155 0
 9152  9153  9154 -54 -9156 0
 9152  9153  9154 -54  9157 0

c  1+1 --> 2
c    (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0 ∧  p_54) -> (-b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0)
c  in CNF:
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_2
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨  b^{6, 10}_1
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ -p_54 ∨ -b^{6, 10}_0
c  in DIMACS:
 9152  9153 -9154 -54 -9155 0
 9152  9153 -9154 -54  9156 0
 9152  9153 -9154 -54 -9157 0

c  2+1 --> break 
c    (-b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧  p_54) -> break
c  in CNF:
c     b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 9152 -9153  9154 -54 1162 0


c  2-1 --> 1
c    (-b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧ -p_54) -> (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0)
c  in CNF:
c     b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_2
c     b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_1
c     b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨  b^{6, 10}_0
c  in DIMACS:
 9152 -9153  9154  54 -9155 0
 9152 -9153  9154  54 -9156 0
 9152 -9153  9154  54  9157 0

c  1-1 --> 0
c    (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0 ∧ -p_54) -> (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧ -b^{6, 10}_0)
c  in CNF:
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_2
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_1
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_0
c  in DIMACS:
 9152  9153 -9154  54 -9155 0
 9152  9153 -9154  54 -9156 0
 9152  9153 -9154  54 -9157 0

c  0-1 --> -1
c    (-b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧ -p_54) -> ( b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0)
c  in CNF:
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨  b^{6, 10}_2
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_1
c     b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨  b^{6, 10}_0
c  in DIMACS:
 9152  9153  9154  54  9155 0
 9152  9153  9154  54 -9156 0
 9152  9153  9154  54  9157 0

c  -1-1 --> -2
c    ( b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧  b^{6, 9}_0 ∧ -p_54) -> ( b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0)
c  in CNF:
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨  b^{6, 10}_2
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨  b^{6, 10}_1
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨  p_54 ∨ -b^{6, 10}_0
c  in DIMACS:
-9152  9153 -9154  54  9155 0
-9152  9153 -9154  54  9156 0
-9152  9153 -9154  54 -9157 0

c  -2-1 --> break 
c    ( b^{6, 9}_2 ∧  b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨  b^{6, 9}_0 ∨  p_54 ∨ break
c  in DIMACS:
-9152 -9153  9154  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 9}_2 ∧ -b^{6, 9}_1 ∧ -b^{6, 9}_0 ∧ true) 
c  in CNF:
c    -b^{6, 9}_2 ∨  b^{6, 9}_1 ∨  b^{6, 9}_0 ∨ false 
c  in DIMACS:
-9152  9153  9154  0

c  3 does not represent an automaton state.
c    -(-b^{6, 9}_2 ∧  b^{6, 9}_1 ∧  b^{6, 9}_0 ∧ true) 
c  in CNF:
c     b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ false 
c  in DIMACS:
 9152 -9153 -9154  0
c  -3 does not represent an automaton state.
c    -( b^{6, 9}_2 ∧  b^{6, 9}_1 ∧  b^{6, 9}_0 ∧ true) 
c  in CNF:
c    -b^{6, 9}_2 ∨ -b^{6, 9}_1 ∨ -b^{6, 9}_0 ∨ false 
c  in DIMACS:
-9152 -9153 -9154  0

c i = 10
c  -2+1 --> -1
c    ( b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧  p_60) -> ( b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0)
c  in CNF:
c    -b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨  b^{6, 11}_2
c    -b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_1
c    -b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨  b^{6, 11}_0
c  in DIMACS:
-9155 -9156  9157 -60  9158 0
-9155 -9156  9157 -60 -9159 0
-9155 -9156  9157 -60  9160 0

c  -1+1 --> 0
c    ( b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0 ∧  p_60) -> (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧ -b^{6, 11}_0)
c  in CNF:
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_2
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_1
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_0
c  in DIMACS:
-9155  9156 -9157 -60 -9158 0
-9155  9156 -9157 -60 -9159 0
-9155  9156 -9157 -60 -9160 0

c  0+1 --> 1
c    (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧  p_60) -> (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0)
c  in CNF:
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_2
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_1
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨  b^{6, 11}_0
c  in DIMACS:
 9155  9156  9157 -60 -9158 0
 9155  9156  9157 -60 -9159 0
 9155  9156  9157 -60  9160 0

c  1+1 --> 2
c    (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0 ∧  p_60) -> (-b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0)
c  in CNF:
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_2
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨  b^{6, 11}_1
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ -p_60 ∨ -b^{6, 11}_0
c  in DIMACS:
 9155  9156 -9157 -60 -9158 0
 9155  9156 -9157 -60  9159 0
 9155  9156 -9157 -60 -9160 0

c  2+1 --> break 
c    (-b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧  p_60) -> break
c  in CNF:
c     b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 9155 -9156  9157 -60 1162 0


c  2-1 --> 1
c    (-b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧ -p_60) -> (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0)
c  in CNF:
c     b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_2
c     b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_1
c     b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨  b^{6, 11}_0
c  in DIMACS:
 9155 -9156  9157  60 -9158 0
 9155 -9156  9157  60 -9159 0
 9155 -9156  9157  60  9160 0

c  1-1 --> 0
c    (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0 ∧ -p_60) -> (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧ -b^{6, 11}_0)
c  in CNF:
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_2
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_1
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_0
c  in DIMACS:
 9155  9156 -9157  60 -9158 0
 9155  9156 -9157  60 -9159 0
 9155  9156 -9157  60 -9160 0

c  0-1 --> -1
c    (-b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧ -p_60) -> ( b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0)
c  in CNF:
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨  b^{6, 11}_2
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_1
c     b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨  b^{6, 11}_0
c  in DIMACS:
 9155  9156  9157  60  9158 0
 9155  9156  9157  60 -9159 0
 9155  9156  9157  60  9160 0

c  -1-1 --> -2
c    ( b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧  b^{6, 10}_0 ∧ -p_60) -> ( b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0)
c  in CNF:
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨  b^{6, 11}_2
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨  b^{6, 11}_1
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨  p_60 ∨ -b^{6, 11}_0
c  in DIMACS:
-9155  9156 -9157  60  9158 0
-9155  9156 -9157  60  9159 0
-9155  9156 -9157  60 -9160 0

c  -2-1 --> break 
c    ( b^{6, 10}_2 ∧  b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨  b^{6, 10}_0 ∨  p_60 ∨ break
c  in DIMACS:
-9155 -9156  9157  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 10}_2 ∧ -b^{6, 10}_1 ∧ -b^{6, 10}_0 ∧ true) 
c  in CNF:
c    -b^{6, 10}_2 ∨  b^{6, 10}_1 ∨  b^{6, 10}_0 ∨ false 
c  in DIMACS:
-9155  9156  9157  0

c  3 does not represent an automaton state.
c    -(-b^{6, 10}_2 ∧  b^{6, 10}_1 ∧  b^{6, 10}_0 ∧ true) 
c  in CNF:
c     b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ false 
c  in DIMACS:
 9155 -9156 -9157  0
c  -3 does not represent an automaton state.
c    -( b^{6, 10}_2 ∧  b^{6, 10}_1 ∧  b^{6, 10}_0 ∧ true) 
c  in CNF:
c    -b^{6, 10}_2 ∨ -b^{6, 10}_1 ∨ -b^{6, 10}_0 ∨ false 
c  in DIMACS:
-9155 -9156 -9157  0

c i = 11
c  -2+1 --> -1
c    ( b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧  p_66) -> ( b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0)
c  in CNF:
c    -b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨  b^{6, 12}_2
c    -b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_1
c    -b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨  b^{6, 12}_0
c  in DIMACS:
-9158 -9159  9160 -66  9161 0
-9158 -9159  9160 -66 -9162 0
-9158 -9159  9160 -66  9163 0

c  -1+1 --> 0
c    ( b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0 ∧  p_66) -> (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧ -b^{6, 12}_0)
c  in CNF:
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_2
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_1
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_0
c  in DIMACS:
-9158  9159 -9160 -66 -9161 0
-9158  9159 -9160 -66 -9162 0
-9158  9159 -9160 -66 -9163 0

c  0+1 --> 1
c    (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧  p_66) -> (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0)
c  in CNF:
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_2
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_1
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨  b^{6, 12}_0
c  in DIMACS:
 9158  9159  9160 -66 -9161 0
 9158  9159  9160 -66 -9162 0
 9158  9159  9160 -66  9163 0

c  1+1 --> 2
c    (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0 ∧  p_66) -> (-b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0)
c  in CNF:
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_2
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨  b^{6, 12}_1
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ -p_66 ∨ -b^{6, 12}_0
c  in DIMACS:
 9158  9159 -9160 -66 -9161 0
 9158  9159 -9160 -66  9162 0
 9158  9159 -9160 -66 -9163 0

c  2+1 --> break 
c    (-b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧  p_66) -> break
c  in CNF:
c     b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 9158 -9159  9160 -66 1162 0


c  2-1 --> 1
c    (-b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧ -p_66) -> (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0)
c  in CNF:
c     b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_2
c     b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_1
c     b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨  b^{6, 12}_0
c  in DIMACS:
 9158 -9159  9160  66 -9161 0
 9158 -9159  9160  66 -9162 0
 9158 -9159  9160  66  9163 0

c  1-1 --> 0
c    (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0 ∧ -p_66) -> (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧ -b^{6, 12}_0)
c  in CNF:
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_2
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_1
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_0
c  in DIMACS:
 9158  9159 -9160  66 -9161 0
 9158  9159 -9160  66 -9162 0
 9158  9159 -9160  66 -9163 0

c  0-1 --> -1
c    (-b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧ -p_66) -> ( b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0)
c  in CNF:
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨  b^{6, 12}_2
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_1
c     b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨  b^{6, 12}_0
c  in DIMACS:
 9158  9159  9160  66  9161 0
 9158  9159  9160  66 -9162 0
 9158  9159  9160  66  9163 0

c  -1-1 --> -2
c    ( b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧  b^{6, 11}_0 ∧ -p_66) -> ( b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0)
c  in CNF:
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨  b^{6, 12}_2
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨  b^{6, 12}_1
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨  p_66 ∨ -b^{6, 12}_0
c  in DIMACS:
-9158  9159 -9160  66  9161 0
-9158  9159 -9160  66  9162 0
-9158  9159 -9160  66 -9163 0

c  -2-1 --> break 
c    ( b^{6, 11}_2 ∧  b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨  b^{6, 11}_0 ∨  p_66 ∨ break
c  in DIMACS:
-9158 -9159  9160  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 11}_2 ∧ -b^{6, 11}_1 ∧ -b^{6, 11}_0 ∧ true) 
c  in CNF:
c    -b^{6, 11}_2 ∨  b^{6, 11}_1 ∨  b^{6, 11}_0 ∨ false 
c  in DIMACS:
-9158  9159  9160  0

c  3 does not represent an automaton state.
c    -(-b^{6, 11}_2 ∧  b^{6, 11}_1 ∧  b^{6, 11}_0 ∧ true) 
c  in CNF:
c     b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ false 
c  in DIMACS:
 9158 -9159 -9160  0
c  -3 does not represent an automaton state.
c    -( b^{6, 11}_2 ∧  b^{6, 11}_1 ∧  b^{6, 11}_0 ∧ true) 
c  in CNF:
c    -b^{6, 11}_2 ∨ -b^{6, 11}_1 ∨ -b^{6, 11}_0 ∨ false 
c  in DIMACS:
-9158 -9159 -9160  0

c i = 12
c  -2+1 --> -1
c    ( b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧  p_72) -> ( b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0)
c  in CNF:
c    -b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨  b^{6, 13}_2
c    -b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_1
c    -b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨  b^{6, 13}_0
c  in DIMACS:
-9161 -9162  9163 -72  9164 0
-9161 -9162  9163 -72 -9165 0
-9161 -9162  9163 -72  9166 0

c  -1+1 --> 0
c    ( b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0 ∧  p_72) -> (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧ -b^{6, 13}_0)
c  in CNF:
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_2
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_1
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_0
c  in DIMACS:
-9161  9162 -9163 -72 -9164 0
-9161  9162 -9163 -72 -9165 0
-9161  9162 -9163 -72 -9166 0

c  0+1 --> 1
c    (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧  p_72) -> (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0)
c  in CNF:
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_2
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_1
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨  b^{6, 13}_0
c  in DIMACS:
 9161  9162  9163 -72 -9164 0
 9161  9162  9163 -72 -9165 0
 9161  9162  9163 -72  9166 0

c  1+1 --> 2
c    (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0 ∧  p_72) -> (-b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0)
c  in CNF:
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_2
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨  b^{6, 13}_1
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ -p_72 ∨ -b^{6, 13}_0
c  in DIMACS:
 9161  9162 -9163 -72 -9164 0
 9161  9162 -9163 -72  9165 0
 9161  9162 -9163 -72 -9166 0

c  2+1 --> break 
c    (-b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧  p_72) -> break
c  in CNF:
c     b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 9161 -9162  9163 -72 1162 0


c  2-1 --> 1
c    (-b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧ -p_72) -> (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0)
c  in CNF:
c     b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_2
c     b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_1
c     b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨  b^{6, 13}_0
c  in DIMACS:
 9161 -9162  9163  72 -9164 0
 9161 -9162  9163  72 -9165 0
 9161 -9162  9163  72  9166 0

c  1-1 --> 0
c    (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0 ∧ -p_72) -> (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧ -b^{6, 13}_0)
c  in CNF:
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_2
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_1
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_0
c  in DIMACS:
 9161  9162 -9163  72 -9164 0
 9161  9162 -9163  72 -9165 0
 9161  9162 -9163  72 -9166 0

c  0-1 --> -1
c    (-b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧ -p_72) -> ( b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0)
c  in CNF:
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨  b^{6, 13}_2
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_1
c     b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨  b^{6, 13}_0
c  in DIMACS:
 9161  9162  9163  72  9164 0
 9161  9162  9163  72 -9165 0
 9161  9162  9163  72  9166 0

c  -1-1 --> -2
c    ( b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧  b^{6, 12}_0 ∧ -p_72) -> ( b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0)
c  in CNF:
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨  b^{6, 13}_2
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨  b^{6, 13}_1
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨  p_72 ∨ -b^{6, 13}_0
c  in DIMACS:
-9161  9162 -9163  72  9164 0
-9161  9162 -9163  72  9165 0
-9161  9162 -9163  72 -9166 0

c  -2-1 --> break 
c    ( b^{6, 12}_2 ∧  b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨  b^{6, 12}_0 ∨  p_72 ∨ break
c  in DIMACS:
-9161 -9162  9163  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 12}_2 ∧ -b^{6, 12}_1 ∧ -b^{6, 12}_0 ∧ true) 
c  in CNF:
c    -b^{6, 12}_2 ∨  b^{6, 12}_1 ∨  b^{6, 12}_0 ∨ false 
c  in DIMACS:
-9161  9162  9163  0

c  3 does not represent an automaton state.
c    -(-b^{6, 12}_2 ∧  b^{6, 12}_1 ∧  b^{6, 12}_0 ∧ true) 
c  in CNF:
c     b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ false 
c  in DIMACS:
 9161 -9162 -9163  0
c  -3 does not represent an automaton state.
c    -( b^{6, 12}_2 ∧  b^{6, 12}_1 ∧  b^{6, 12}_0 ∧ true) 
c  in CNF:
c    -b^{6, 12}_2 ∨ -b^{6, 12}_1 ∨ -b^{6, 12}_0 ∨ false 
c  in DIMACS:
-9161 -9162 -9163  0

c i = 13
c  -2+1 --> -1
c    ( b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧  p_78) -> ( b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0)
c  in CNF:
c    -b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨  b^{6, 14}_2
c    -b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_1
c    -b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨  b^{6, 14}_0
c  in DIMACS:
-9164 -9165  9166 -78  9167 0
-9164 -9165  9166 -78 -9168 0
-9164 -9165  9166 -78  9169 0

c  -1+1 --> 0
c    ( b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0 ∧  p_78) -> (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧ -b^{6, 14}_0)
c  in CNF:
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_2
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_1
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_0
c  in DIMACS:
-9164  9165 -9166 -78 -9167 0
-9164  9165 -9166 -78 -9168 0
-9164  9165 -9166 -78 -9169 0

c  0+1 --> 1
c    (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧  p_78) -> (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0)
c  in CNF:
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_2
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_1
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨  b^{6, 14}_0
c  in DIMACS:
 9164  9165  9166 -78 -9167 0
 9164  9165  9166 -78 -9168 0
 9164  9165  9166 -78  9169 0

c  1+1 --> 2
c    (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0 ∧  p_78) -> (-b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0)
c  in CNF:
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_2
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨  b^{6, 14}_1
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ -p_78 ∨ -b^{6, 14}_0
c  in DIMACS:
 9164  9165 -9166 -78 -9167 0
 9164  9165 -9166 -78  9168 0
 9164  9165 -9166 -78 -9169 0

c  2+1 --> break 
c    (-b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧  p_78) -> break
c  in CNF:
c     b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 9164 -9165  9166 -78 1162 0


c  2-1 --> 1
c    (-b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧ -p_78) -> (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0)
c  in CNF:
c     b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_2
c     b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_1
c     b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨  b^{6, 14}_0
c  in DIMACS:
 9164 -9165  9166  78 -9167 0
 9164 -9165  9166  78 -9168 0
 9164 -9165  9166  78  9169 0

c  1-1 --> 0
c    (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0 ∧ -p_78) -> (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧ -b^{6, 14}_0)
c  in CNF:
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_2
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_1
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_0
c  in DIMACS:
 9164  9165 -9166  78 -9167 0
 9164  9165 -9166  78 -9168 0
 9164  9165 -9166  78 -9169 0

c  0-1 --> -1
c    (-b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧ -p_78) -> ( b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0)
c  in CNF:
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨  b^{6, 14}_2
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_1
c     b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨  b^{6, 14}_0
c  in DIMACS:
 9164  9165  9166  78  9167 0
 9164  9165  9166  78 -9168 0
 9164  9165  9166  78  9169 0

c  -1-1 --> -2
c    ( b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧  b^{6, 13}_0 ∧ -p_78) -> ( b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0)
c  in CNF:
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨  b^{6, 14}_2
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨  b^{6, 14}_1
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨  p_78 ∨ -b^{6, 14}_0
c  in DIMACS:
-9164  9165 -9166  78  9167 0
-9164  9165 -9166  78  9168 0
-9164  9165 -9166  78 -9169 0

c  -2-1 --> break 
c    ( b^{6, 13}_2 ∧  b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨  b^{6, 13}_0 ∨  p_78 ∨ break
c  in DIMACS:
-9164 -9165  9166  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 13}_2 ∧ -b^{6, 13}_1 ∧ -b^{6, 13}_0 ∧ true) 
c  in CNF:
c    -b^{6, 13}_2 ∨  b^{6, 13}_1 ∨  b^{6, 13}_0 ∨ false 
c  in DIMACS:
-9164  9165  9166  0

c  3 does not represent an automaton state.
c    -(-b^{6, 13}_2 ∧  b^{6, 13}_1 ∧  b^{6, 13}_0 ∧ true) 
c  in CNF:
c     b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ false 
c  in DIMACS:
 9164 -9165 -9166  0
c  -3 does not represent an automaton state.
c    -( b^{6, 13}_2 ∧  b^{6, 13}_1 ∧  b^{6, 13}_0 ∧ true) 
c  in CNF:
c    -b^{6, 13}_2 ∨ -b^{6, 13}_1 ∨ -b^{6, 13}_0 ∨ false 
c  in DIMACS:
-9164 -9165 -9166  0

c i = 14
c  -2+1 --> -1
c    ( b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧  p_84) -> ( b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0)
c  in CNF:
c    -b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨  b^{6, 15}_2
c    -b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_1
c    -b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨  b^{6, 15}_0
c  in DIMACS:
-9167 -9168  9169 -84  9170 0
-9167 -9168  9169 -84 -9171 0
-9167 -9168  9169 -84  9172 0

c  -1+1 --> 0
c    ( b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0 ∧  p_84) -> (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧ -b^{6, 15}_0)
c  in CNF:
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_2
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_1
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_0
c  in DIMACS:
-9167  9168 -9169 -84 -9170 0
-9167  9168 -9169 -84 -9171 0
-9167  9168 -9169 -84 -9172 0

c  0+1 --> 1
c    (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧  p_84) -> (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0)
c  in CNF:
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_2
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_1
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨  b^{6, 15}_0
c  in DIMACS:
 9167  9168  9169 -84 -9170 0
 9167  9168  9169 -84 -9171 0
 9167  9168  9169 -84  9172 0

c  1+1 --> 2
c    (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0 ∧  p_84) -> (-b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0)
c  in CNF:
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_2
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨  b^{6, 15}_1
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ -p_84 ∨ -b^{6, 15}_0
c  in DIMACS:
 9167  9168 -9169 -84 -9170 0
 9167  9168 -9169 -84  9171 0
 9167  9168 -9169 -84 -9172 0

c  2+1 --> break 
c    (-b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧  p_84) -> break
c  in CNF:
c     b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 9167 -9168  9169 -84 1162 0


c  2-1 --> 1
c    (-b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧ -p_84) -> (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0)
c  in CNF:
c     b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_2
c     b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_1
c     b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨  b^{6, 15}_0
c  in DIMACS:
 9167 -9168  9169  84 -9170 0
 9167 -9168  9169  84 -9171 0
 9167 -9168  9169  84  9172 0

c  1-1 --> 0
c    (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0 ∧ -p_84) -> (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧ -b^{6, 15}_0)
c  in CNF:
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_2
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_1
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_0
c  in DIMACS:
 9167  9168 -9169  84 -9170 0
 9167  9168 -9169  84 -9171 0
 9167  9168 -9169  84 -9172 0

c  0-1 --> -1
c    (-b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧ -p_84) -> ( b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0)
c  in CNF:
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨  b^{6, 15}_2
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_1
c     b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨  b^{6, 15}_0
c  in DIMACS:
 9167  9168  9169  84  9170 0
 9167  9168  9169  84 -9171 0
 9167  9168  9169  84  9172 0

c  -1-1 --> -2
c    ( b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧  b^{6, 14}_0 ∧ -p_84) -> ( b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0)
c  in CNF:
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨  b^{6, 15}_2
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨  b^{6, 15}_1
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨  p_84 ∨ -b^{6, 15}_0
c  in DIMACS:
-9167  9168 -9169  84  9170 0
-9167  9168 -9169  84  9171 0
-9167  9168 -9169  84 -9172 0

c  -2-1 --> break 
c    ( b^{6, 14}_2 ∧  b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨  b^{6, 14}_0 ∨  p_84 ∨ break
c  in DIMACS:
-9167 -9168  9169  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 14}_2 ∧ -b^{6, 14}_1 ∧ -b^{6, 14}_0 ∧ true) 
c  in CNF:
c    -b^{6, 14}_2 ∨  b^{6, 14}_1 ∨  b^{6, 14}_0 ∨ false 
c  in DIMACS:
-9167  9168  9169  0

c  3 does not represent an automaton state.
c    -(-b^{6, 14}_2 ∧  b^{6, 14}_1 ∧  b^{6, 14}_0 ∧ true) 
c  in CNF:
c     b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ false 
c  in DIMACS:
 9167 -9168 -9169  0
c  -3 does not represent an automaton state.
c    -( b^{6, 14}_2 ∧  b^{6, 14}_1 ∧  b^{6, 14}_0 ∧ true) 
c  in CNF:
c    -b^{6, 14}_2 ∨ -b^{6, 14}_1 ∨ -b^{6, 14}_0 ∨ false 
c  in DIMACS:
-9167 -9168 -9169  0

c i = 15
c  -2+1 --> -1
c    ( b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧  p_90) -> ( b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0)
c  in CNF:
c    -b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨  b^{6, 16}_2
c    -b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_1
c    -b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨  b^{6, 16}_0
c  in DIMACS:
-9170 -9171  9172 -90  9173 0
-9170 -9171  9172 -90 -9174 0
-9170 -9171  9172 -90  9175 0

c  -1+1 --> 0
c    ( b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0 ∧  p_90) -> (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧ -b^{6, 16}_0)
c  in CNF:
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_2
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_1
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_0
c  in DIMACS:
-9170  9171 -9172 -90 -9173 0
-9170  9171 -9172 -90 -9174 0
-9170  9171 -9172 -90 -9175 0

c  0+1 --> 1
c    (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧  p_90) -> (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0)
c  in CNF:
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_2
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_1
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨  b^{6, 16}_0
c  in DIMACS:
 9170  9171  9172 -90 -9173 0
 9170  9171  9172 -90 -9174 0
 9170  9171  9172 -90  9175 0

c  1+1 --> 2
c    (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0 ∧  p_90) -> (-b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0)
c  in CNF:
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_2
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨  b^{6, 16}_1
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ -p_90 ∨ -b^{6, 16}_0
c  in DIMACS:
 9170  9171 -9172 -90 -9173 0
 9170  9171 -9172 -90  9174 0
 9170  9171 -9172 -90 -9175 0

c  2+1 --> break 
c    (-b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧  p_90) -> break
c  in CNF:
c     b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 9170 -9171  9172 -90 1162 0


c  2-1 --> 1
c    (-b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧ -p_90) -> (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0)
c  in CNF:
c     b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_2
c     b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_1
c     b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨  b^{6, 16}_0
c  in DIMACS:
 9170 -9171  9172  90 -9173 0
 9170 -9171  9172  90 -9174 0
 9170 -9171  9172  90  9175 0

c  1-1 --> 0
c    (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0 ∧ -p_90) -> (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧ -b^{6, 16}_0)
c  in CNF:
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_2
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_1
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_0
c  in DIMACS:
 9170  9171 -9172  90 -9173 0
 9170  9171 -9172  90 -9174 0
 9170  9171 -9172  90 -9175 0

c  0-1 --> -1
c    (-b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧ -p_90) -> ( b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0)
c  in CNF:
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨  b^{6, 16}_2
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_1
c     b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨  b^{6, 16}_0
c  in DIMACS:
 9170  9171  9172  90  9173 0
 9170  9171  9172  90 -9174 0
 9170  9171  9172  90  9175 0

c  -1-1 --> -2
c    ( b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧  b^{6, 15}_0 ∧ -p_90) -> ( b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0)
c  in CNF:
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨  b^{6, 16}_2
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨  b^{6, 16}_1
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨  p_90 ∨ -b^{6, 16}_0
c  in DIMACS:
-9170  9171 -9172  90  9173 0
-9170  9171 -9172  90  9174 0
-9170  9171 -9172  90 -9175 0

c  -2-1 --> break 
c    ( b^{6, 15}_2 ∧  b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨  b^{6, 15}_0 ∨  p_90 ∨ break
c  in DIMACS:
-9170 -9171  9172  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 15}_2 ∧ -b^{6, 15}_1 ∧ -b^{6, 15}_0 ∧ true) 
c  in CNF:
c    -b^{6, 15}_2 ∨  b^{6, 15}_1 ∨  b^{6, 15}_0 ∨ false 
c  in DIMACS:
-9170  9171  9172  0

c  3 does not represent an automaton state.
c    -(-b^{6, 15}_2 ∧  b^{6, 15}_1 ∧  b^{6, 15}_0 ∧ true) 
c  in CNF:
c     b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ false 
c  in DIMACS:
 9170 -9171 -9172  0
c  -3 does not represent an automaton state.
c    -( b^{6, 15}_2 ∧  b^{6, 15}_1 ∧  b^{6, 15}_0 ∧ true) 
c  in CNF:
c    -b^{6, 15}_2 ∨ -b^{6, 15}_1 ∨ -b^{6, 15}_0 ∨ false 
c  in DIMACS:
-9170 -9171 -9172  0

c i = 16
c  -2+1 --> -1
c    ( b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧  p_96) -> ( b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0)
c  in CNF:
c    -b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨  b^{6, 17}_2
c    -b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_1
c    -b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨  b^{6, 17}_0
c  in DIMACS:
-9173 -9174  9175 -96  9176 0
-9173 -9174  9175 -96 -9177 0
-9173 -9174  9175 -96  9178 0

c  -1+1 --> 0
c    ( b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0 ∧  p_96) -> (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧ -b^{6, 17}_0)
c  in CNF:
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_2
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_1
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_0
c  in DIMACS:
-9173  9174 -9175 -96 -9176 0
-9173  9174 -9175 -96 -9177 0
-9173  9174 -9175 -96 -9178 0

c  0+1 --> 1
c    (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧  p_96) -> (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0)
c  in CNF:
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_2
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_1
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨  b^{6, 17}_0
c  in DIMACS:
 9173  9174  9175 -96 -9176 0
 9173  9174  9175 -96 -9177 0
 9173  9174  9175 -96  9178 0

c  1+1 --> 2
c    (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0 ∧  p_96) -> (-b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0)
c  in CNF:
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_2
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨  b^{6, 17}_1
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ -p_96 ∨ -b^{6, 17}_0
c  in DIMACS:
 9173  9174 -9175 -96 -9176 0
 9173  9174 -9175 -96  9177 0
 9173  9174 -9175 -96 -9178 0

c  2+1 --> break 
c    (-b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧  p_96) -> break
c  in CNF:
c     b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 9173 -9174  9175 -96 1162 0


c  2-1 --> 1
c    (-b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧ -p_96) -> (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0)
c  in CNF:
c     b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_2
c     b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_1
c     b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨  b^{6, 17}_0
c  in DIMACS:
 9173 -9174  9175  96 -9176 0
 9173 -9174  9175  96 -9177 0
 9173 -9174  9175  96  9178 0

c  1-1 --> 0
c    (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0 ∧ -p_96) -> (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧ -b^{6, 17}_0)
c  in CNF:
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_2
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_1
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_0
c  in DIMACS:
 9173  9174 -9175  96 -9176 0
 9173  9174 -9175  96 -9177 0
 9173  9174 -9175  96 -9178 0

c  0-1 --> -1
c    (-b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧ -p_96) -> ( b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0)
c  in CNF:
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨  b^{6, 17}_2
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_1
c     b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨  b^{6, 17}_0
c  in DIMACS:
 9173  9174  9175  96  9176 0
 9173  9174  9175  96 -9177 0
 9173  9174  9175  96  9178 0

c  -1-1 --> -2
c    ( b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧  b^{6, 16}_0 ∧ -p_96) -> ( b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0)
c  in CNF:
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨  b^{6, 17}_2
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨  b^{6, 17}_1
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨  p_96 ∨ -b^{6, 17}_0
c  in DIMACS:
-9173  9174 -9175  96  9176 0
-9173  9174 -9175  96  9177 0
-9173  9174 -9175  96 -9178 0

c  -2-1 --> break 
c    ( b^{6, 16}_2 ∧  b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨  b^{6, 16}_0 ∨  p_96 ∨ break
c  in DIMACS:
-9173 -9174  9175  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 16}_2 ∧ -b^{6, 16}_1 ∧ -b^{6, 16}_0 ∧ true) 
c  in CNF:
c    -b^{6, 16}_2 ∨  b^{6, 16}_1 ∨  b^{6, 16}_0 ∨ false 
c  in DIMACS:
-9173  9174  9175  0

c  3 does not represent an automaton state.
c    -(-b^{6, 16}_2 ∧  b^{6, 16}_1 ∧  b^{6, 16}_0 ∧ true) 
c  in CNF:
c     b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ false 
c  in DIMACS:
 9173 -9174 -9175  0
c  -3 does not represent an automaton state.
c    -( b^{6, 16}_2 ∧  b^{6, 16}_1 ∧  b^{6, 16}_0 ∧ true) 
c  in CNF:
c    -b^{6, 16}_2 ∨ -b^{6, 16}_1 ∨ -b^{6, 16}_0 ∨ false 
c  in DIMACS:
-9173 -9174 -9175  0

c i = 17
c  -2+1 --> -1
c    ( b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧  p_102) -> ( b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0)
c  in CNF:
c    -b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨  b^{6, 18}_2
c    -b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_1
c    -b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨  b^{6, 18}_0
c  in DIMACS:
-9176 -9177  9178 -102  9179 0
-9176 -9177  9178 -102 -9180 0
-9176 -9177  9178 -102  9181 0

c  -1+1 --> 0
c    ( b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0 ∧  p_102) -> (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧ -b^{6, 18}_0)
c  in CNF:
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_2
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_1
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_0
c  in DIMACS:
-9176  9177 -9178 -102 -9179 0
-9176  9177 -9178 -102 -9180 0
-9176  9177 -9178 -102 -9181 0

c  0+1 --> 1
c    (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧  p_102) -> (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0)
c  in CNF:
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_2
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_1
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨  b^{6, 18}_0
c  in DIMACS:
 9176  9177  9178 -102 -9179 0
 9176  9177  9178 -102 -9180 0
 9176  9177  9178 -102  9181 0

c  1+1 --> 2
c    (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0 ∧  p_102) -> (-b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0)
c  in CNF:
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_2
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨  b^{6, 18}_1
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ -p_102 ∨ -b^{6, 18}_0
c  in DIMACS:
 9176  9177 -9178 -102 -9179 0
 9176  9177 -9178 -102  9180 0
 9176  9177 -9178 -102 -9181 0

c  2+1 --> break 
c    (-b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧  p_102) -> break
c  in CNF:
c     b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 9176 -9177  9178 -102 1162 0


c  2-1 --> 1
c    (-b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧ -p_102) -> (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0)
c  in CNF:
c     b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_2
c     b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_1
c     b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨  b^{6, 18}_0
c  in DIMACS:
 9176 -9177  9178  102 -9179 0
 9176 -9177  9178  102 -9180 0
 9176 -9177  9178  102  9181 0

c  1-1 --> 0
c    (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0 ∧ -p_102) -> (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧ -b^{6, 18}_0)
c  in CNF:
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_2
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_1
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_0
c  in DIMACS:
 9176  9177 -9178  102 -9179 0
 9176  9177 -9178  102 -9180 0
 9176  9177 -9178  102 -9181 0

c  0-1 --> -1
c    (-b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧ -p_102) -> ( b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0)
c  in CNF:
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨  b^{6, 18}_2
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_1
c     b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨  b^{6, 18}_0
c  in DIMACS:
 9176  9177  9178  102  9179 0
 9176  9177  9178  102 -9180 0
 9176  9177  9178  102  9181 0

c  -1-1 --> -2
c    ( b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧  b^{6, 17}_0 ∧ -p_102) -> ( b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0)
c  in CNF:
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨  b^{6, 18}_2
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨  b^{6, 18}_1
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨  p_102 ∨ -b^{6, 18}_0
c  in DIMACS:
-9176  9177 -9178  102  9179 0
-9176  9177 -9178  102  9180 0
-9176  9177 -9178  102 -9181 0

c  -2-1 --> break 
c    ( b^{6, 17}_2 ∧  b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨  b^{6, 17}_0 ∨  p_102 ∨ break
c  in DIMACS:
-9176 -9177  9178  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 17}_2 ∧ -b^{6, 17}_1 ∧ -b^{6, 17}_0 ∧ true) 
c  in CNF:
c    -b^{6, 17}_2 ∨  b^{6, 17}_1 ∨  b^{6, 17}_0 ∨ false 
c  in DIMACS:
-9176  9177  9178  0

c  3 does not represent an automaton state.
c    -(-b^{6, 17}_2 ∧  b^{6, 17}_1 ∧  b^{6, 17}_0 ∧ true) 
c  in CNF:
c     b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ false 
c  in DIMACS:
 9176 -9177 -9178  0
c  -3 does not represent an automaton state.
c    -( b^{6, 17}_2 ∧  b^{6, 17}_1 ∧  b^{6, 17}_0 ∧ true) 
c  in CNF:
c    -b^{6, 17}_2 ∨ -b^{6, 17}_1 ∨ -b^{6, 17}_0 ∨ false 
c  in DIMACS:
-9176 -9177 -9178  0

c i = 18
c  -2+1 --> -1
c    ( b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧  p_108) -> ( b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0)
c  in CNF:
c    -b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨  b^{6, 19}_2
c    -b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_1
c    -b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨  b^{6, 19}_0
c  in DIMACS:
-9179 -9180  9181 -108  9182 0
-9179 -9180  9181 -108 -9183 0
-9179 -9180  9181 -108  9184 0

c  -1+1 --> 0
c    ( b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0 ∧  p_108) -> (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧ -b^{6, 19}_0)
c  in CNF:
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_2
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_1
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_0
c  in DIMACS:
-9179  9180 -9181 -108 -9182 0
-9179  9180 -9181 -108 -9183 0
-9179  9180 -9181 -108 -9184 0

c  0+1 --> 1
c    (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧  p_108) -> (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0)
c  in CNF:
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_2
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_1
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨  b^{6, 19}_0
c  in DIMACS:
 9179  9180  9181 -108 -9182 0
 9179  9180  9181 -108 -9183 0
 9179  9180  9181 -108  9184 0

c  1+1 --> 2
c    (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0 ∧  p_108) -> (-b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0)
c  in CNF:
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_2
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨  b^{6, 19}_1
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ -p_108 ∨ -b^{6, 19}_0
c  in DIMACS:
 9179  9180 -9181 -108 -9182 0
 9179  9180 -9181 -108  9183 0
 9179  9180 -9181 -108 -9184 0

c  2+1 --> break 
c    (-b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧  p_108) -> break
c  in CNF:
c     b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 9179 -9180  9181 -108 1162 0


c  2-1 --> 1
c    (-b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧ -p_108) -> (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0)
c  in CNF:
c     b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_2
c     b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_1
c     b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨  b^{6, 19}_0
c  in DIMACS:
 9179 -9180  9181  108 -9182 0
 9179 -9180  9181  108 -9183 0
 9179 -9180  9181  108  9184 0

c  1-1 --> 0
c    (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0 ∧ -p_108) -> (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧ -b^{6, 19}_0)
c  in CNF:
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_2
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_1
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_0
c  in DIMACS:
 9179  9180 -9181  108 -9182 0
 9179  9180 -9181  108 -9183 0
 9179  9180 -9181  108 -9184 0

c  0-1 --> -1
c    (-b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧ -p_108) -> ( b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0)
c  in CNF:
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨  b^{6, 19}_2
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_1
c     b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨  b^{6, 19}_0
c  in DIMACS:
 9179  9180  9181  108  9182 0
 9179  9180  9181  108 -9183 0
 9179  9180  9181  108  9184 0

c  -1-1 --> -2
c    ( b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧  b^{6, 18}_0 ∧ -p_108) -> ( b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0)
c  in CNF:
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨  b^{6, 19}_2
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨  b^{6, 19}_1
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨  p_108 ∨ -b^{6, 19}_0
c  in DIMACS:
-9179  9180 -9181  108  9182 0
-9179  9180 -9181  108  9183 0
-9179  9180 -9181  108 -9184 0

c  -2-1 --> break 
c    ( b^{6, 18}_2 ∧  b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨  b^{6, 18}_0 ∨  p_108 ∨ break
c  in DIMACS:
-9179 -9180  9181  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 18}_2 ∧ -b^{6, 18}_1 ∧ -b^{6, 18}_0 ∧ true) 
c  in CNF:
c    -b^{6, 18}_2 ∨  b^{6, 18}_1 ∨  b^{6, 18}_0 ∨ false 
c  in DIMACS:
-9179  9180  9181  0

c  3 does not represent an automaton state.
c    -(-b^{6, 18}_2 ∧  b^{6, 18}_1 ∧  b^{6, 18}_0 ∧ true) 
c  in CNF:
c     b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ false 
c  in DIMACS:
 9179 -9180 -9181  0
c  -3 does not represent an automaton state.
c    -( b^{6, 18}_2 ∧  b^{6, 18}_1 ∧  b^{6, 18}_0 ∧ true) 
c  in CNF:
c    -b^{6, 18}_2 ∨ -b^{6, 18}_1 ∨ -b^{6, 18}_0 ∨ false 
c  in DIMACS:
-9179 -9180 -9181  0

c i = 19
c  -2+1 --> -1
c    ( b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧  p_114) -> ( b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0)
c  in CNF:
c    -b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨  b^{6, 20}_2
c    -b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_1
c    -b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨  b^{6, 20}_0
c  in DIMACS:
-9182 -9183  9184 -114  9185 0
-9182 -9183  9184 -114 -9186 0
-9182 -9183  9184 -114  9187 0

c  -1+1 --> 0
c    ( b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0 ∧  p_114) -> (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧ -b^{6, 20}_0)
c  in CNF:
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_2
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_1
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_0
c  in DIMACS:
-9182  9183 -9184 -114 -9185 0
-9182  9183 -9184 -114 -9186 0
-9182  9183 -9184 -114 -9187 0

c  0+1 --> 1
c    (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧  p_114) -> (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0)
c  in CNF:
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_2
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_1
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨  b^{6, 20}_0
c  in DIMACS:
 9182  9183  9184 -114 -9185 0
 9182  9183  9184 -114 -9186 0
 9182  9183  9184 -114  9187 0

c  1+1 --> 2
c    (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0 ∧  p_114) -> (-b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0)
c  in CNF:
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_2
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨  b^{6, 20}_1
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ -p_114 ∨ -b^{6, 20}_0
c  in DIMACS:
 9182  9183 -9184 -114 -9185 0
 9182  9183 -9184 -114  9186 0
 9182  9183 -9184 -114 -9187 0

c  2+1 --> break 
c    (-b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧  p_114) -> break
c  in CNF:
c     b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 9182 -9183  9184 -114 1162 0


c  2-1 --> 1
c    (-b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧ -p_114) -> (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0)
c  in CNF:
c     b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_2
c     b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_1
c     b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨  b^{6, 20}_0
c  in DIMACS:
 9182 -9183  9184  114 -9185 0
 9182 -9183  9184  114 -9186 0
 9182 -9183  9184  114  9187 0

c  1-1 --> 0
c    (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0 ∧ -p_114) -> (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧ -b^{6, 20}_0)
c  in CNF:
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_2
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_1
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_0
c  in DIMACS:
 9182  9183 -9184  114 -9185 0
 9182  9183 -9184  114 -9186 0
 9182  9183 -9184  114 -9187 0

c  0-1 --> -1
c    (-b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧ -p_114) -> ( b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0)
c  in CNF:
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨  b^{6, 20}_2
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_1
c     b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨  b^{6, 20}_0
c  in DIMACS:
 9182  9183  9184  114  9185 0
 9182  9183  9184  114 -9186 0
 9182  9183  9184  114  9187 0

c  -1-1 --> -2
c    ( b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧  b^{6, 19}_0 ∧ -p_114) -> ( b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0)
c  in CNF:
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨  b^{6, 20}_2
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨  b^{6, 20}_1
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨  p_114 ∨ -b^{6, 20}_0
c  in DIMACS:
-9182  9183 -9184  114  9185 0
-9182  9183 -9184  114  9186 0
-9182  9183 -9184  114 -9187 0

c  -2-1 --> break 
c    ( b^{6, 19}_2 ∧  b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨  b^{6, 19}_0 ∨  p_114 ∨ break
c  in DIMACS:
-9182 -9183  9184  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 19}_2 ∧ -b^{6, 19}_1 ∧ -b^{6, 19}_0 ∧ true) 
c  in CNF:
c    -b^{6, 19}_2 ∨  b^{6, 19}_1 ∨  b^{6, 19}_0 ∨ false 
c  in DIMACS:
-9182  9183  9184  0

c  3 does not represent an automaton state.
c    -(-b^{6, 19}_2 ∧  b^{6, 19}_1 ∧  b^{6, 19}_0 ∧ true) 
c  in CNF:
c     b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ false 
c  in DIMACS:
 9182 -9183 -9184  0
c  -3 does not represent an automaton state.
c    -( b^{6, 19}_2 ∧  b^{6, 19}_1 ∧  b^{6, 19}_0 ∧ true) 
c  in CNF:
c    -b^{6, 19}_2 ∨ -b^{6, 19}_1 ∨ -b^{6, 19}_0 ∨ false 
c  in DIMACS:
-9182 -9183 -9184  0

c i = 20
c  -2+1 --> -1
c    ( b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧  p_120) -> ( b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0)
c  in CNF:
c    -b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨  b^{6, 21}_2
c    -b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_1
c    -b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨  b^{6, 21}_0
c  in DIMACS:
-9185 -9186  9187 -120  9188 0
-9185 -9186  9187 -120 -9189 0
-9185 -9186  9187 -120  9190 0

c  -1+1 --> 0
c    ( b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0 ∧  p_120) -> (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧ -b^{6, 21}_0)
c  in CNF:
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_2
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_1
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_0
c  in DIMACS:
-9185  9186 -9187 -120 -9188 0
-9185  9186 -9187 -120 -9189 0
-9185  9186 -9187 -120 -9190 0

c  0+1 --> 1
c    (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧  p_120) -> (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0)
c  in CNF:
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_2
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_1
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨  b^{6, 21}_0
c  in DIMACS:
 9185  9186  9187 -120 -9188 0
 9185  9186  9187 -120 -9189 0
 9185  9186  9187 -120  9190 0

c  1+1 --> 2
c    (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0 ∧  p_120) -> (-b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0)
c  in CNF:
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_2
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨  b^{6, 21}_1
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ -p_120 ∨ -b^{6, 21}_0
c  in DIMACS:
 9185  9186 -9187 -120 -9188 0
 9185  9186 -9187 -120  9189 0
 9185  9186 -9187 -120 -9190 0

c  2+1 --> break 
c    (-b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧  p_120) -> break
c  in CNF:
c     b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 9185 -9186  9187 -120 1162 0


c  2-1 --> 1
c    (-b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧ -p_120) -> (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0)
c  in CNF:
c     b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_2
c     b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_1
c     b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨  b^{6, 21}_0
c  in DIMACS:
 9185 -9186  9187  120 -9188 0
 9185 -9186  9187  120 -9189 0
 9185 -9186  9187  120  9190 0

c  1-1 --> 0
c    (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0 ∧ -p_120) -> (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧ -b^{6, 21}_0)
c  in CNF:
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_2
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_1
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_0
c  in DIMACS:
 9185  9186 -9187  120 -9188 0
 9185  9186 -9187  120 -9189 0
 9185  9186 -9187  120 -9190 0

c  0-1 --> -1
c    (-b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧ -p_120) -> ( b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0)
c  in CNF:
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨  b^{6, 21}_2
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_1
c     b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨  b^{6, 21}_0
c  in DIMACS:
 9185  9186  9187  120  9188 0
 9185  9186  9187  120 -9189 0
 9185  9186  9187  120  9190 0

c  -1-1 --> -2
c    ( b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧  b^{6, 20}_0 ∧ -p_120) -> ( b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0)
c  in CNF:
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨  b^{6, 21}_2
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨  b^{6, 21}_1
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨  p_120 ∨ -b^{6, 21}_0
c  in DIMACS:
-9185  9186 -9187  120  9188 0
-9185  9186 -9187  120  9189 0
-9185  9186 -9187  120 -9190 0

c  -2-1 --> break 
c    ( b^{6, 20}_2 ∧  b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨  b^{6, 20}_0 ∨  p_120 ∨ break
c  in DIMACS:
-9185 -9186  9187  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 20}_2 ∧ -b^{6, 20}_1 ∧ -b^{6, 20}_0 ∧ true) 
c  in CNF:
c    -b^{6, 20}_2 ∨  b^{6, 20}_1 ∨  b^{6, 20}_0 ∨ false 
c  in DIMACS:
-9185  9186  9187  0

c  3 does not represent an automaton state.
c    -(-b^{6, 20}_2 ∧  b^{6, 20}_1 ∧  b^{6, 20}_0 ∧ true) 
c  in CNF:
c     b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ false 
c  in DIMACS:
 9185 -9186 -9187  0
c  -3 does not represent an automaton state.
c    -( b^{6, 20}_2 ∧  b^{6, 20}_1 ∧  b^{6, 20}_0 ∧ true) 
c  in CNF:
c    -b^{6, 20}_2 ∨ -b^{6, 20}_1 ∨ -b^{6, 20}_0 ∨ false 
c  in DIMACS:
-9185 -9186 -9187  0

c i = 21
c  -2+1 --> -1
c    ( b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧  p_126) -> ( b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0)
c  in CNF:
c    -b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨  b^{6, 22}_2
c    -b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_1
c    -b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨  b^{6, 22}_0
c  in DIMACS:
-9188 -9189  9190 -126  9191 0
-9188 -9189  9190 -126 -9192 0
-9188 -9189  9190 -126  9193 0

c  -1+1 --> 0
c    ( b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0 ∧  p_126) -> (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧ -b^{6, 22}_0)
c  in CNF:
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_2
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_1
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_0
c  in DIMACS:
-9188  9189 -9190 -126 -9191 0
-9188  9189 -9190 -126 -9192 0
-9188  9189 -9190 -126 -9193 0

c  0+1 --> 1
c    (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧  p_126) -> (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0)
c  in CNF:
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_2
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_1
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨  b^{6, 22}_0
c  in DIMACS:
 9188  9189  9190 -126 -9191 0
 9188  9189  9190 -126 -9192 0
 9188  9189  9190 -126  9193 0

c  1+1 --> 2
c    (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0 ∧  p_126) -> (-b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0)
c  in CNF:
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_2
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨  b^{6, 22}_1
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ -p_126 ∨ -b^{6, 22}_0
c  in DIMACS:
 9188  9189 -9190 -126 -9191 0
 9188  9189 -9190 -126  9192 0
 9188  9189 -9190 -126 -9193 0

c  2+1 --> break 
c    (-b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧  p_126) -> break
c  in CNF:
c     b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 9188 -9189  9190 -126 1162 0


c  2-1 --> 1
c    (-b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧ -p_126) -> (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0)
c  in CNF:
c     b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_2
c     b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_1
c     b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨  b^{6, 22}_0
c  in DIMACS:
 9188 -9189  9190  126 -9191 0
 9188 -9189  9190  126 -9192 0
 9188 -9189  9190  126  9193 0

c  1-1 --> 0
c    (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0 ∧ -p_126) -> (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧ -b^{6, 22}_0)
c  in CNF:
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_2
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_1
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_0
c  in DIMACS:
 9188  9189 -9190  126 -9191 0
 9188  9189 -9190  126 -9192 0
 9188  9189 -9190  126 -9193 0

c  0-1 --> -1
c    (-b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧ -p_126) -> ( b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0)
c  in CNF:
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨  b^{6, 22}_2
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_1
c     b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨  b^{6, 22}_0
c  in DIMACS:
 9188  9189  9190  126  9191 0
 9188  9189  9190  126 -9192 0
 9188  9189  9190  126  9193 0

c  -1-1 --> -2
c    ( b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧  b^{6, 21}_0 ∧ -p_126) -> ( b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0)
c  in CNF:
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨  b^{6, 22}_2
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨  b^{6, 22}_1
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨  p_126 ∨ -b^{6, 22}_0
c  in DIMACS:
-9188  9189 -9190  126  9191 0
-9188  9189 -9190  126  9192 0
-9188  9189 -9190  126 -9193 0

c  -2-1 --> break 
c    ( b^{6, 21}_2 ∧  b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨  b^{6, 21}_0 ∨  p_126 ∨ break
c  in DIMACS:
-9188 -9189  9190  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 21}_2 ∧ -b^{6, 21}_1 ∧ -b^{6, 21}_0 ∧ true) 
c  in CNF:
c    -b^{6, 21}_2 ∨  b^{6, 21}_1 ∨  b^{6, 21}_0 ∨ false 
c  in DIMACS:
-9188  9189  9190  0

c  3 does not represent an automaton state.
c    -(-b^{6, 21}_2 ∧  b^{6, 21}_1 ∧  b^{6, 21}_0 ∧ true) 
c  in CNF:
c     b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ false 
c  in DIMACS:
 9188 -9189 -9190  0
c  -3 does not represent an automaton state.
c    -( b^{6, 21}_2 ∧  b^{6, 21}_1 ∧  b^{6, 21}_0 ∧ true) 
c  in CNF:
c    -b^{6, 21}_2 ∨ -b^{6, 21}_1 ∨ -b^{6, 21}_0 ∨ false 
c  in DIMACS:
-9188 -9189 -9190  0

c i = 22
c  -2+1 --> -1
c    ( b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧  p_132) -> ( b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0)
c  in CNF:
c    -b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨  b^{6, 23}_2
c    -b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_1
c    -b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨  b^{6, 23}_0
c  in DIMACS:
-9191 -9192  9193 -132  9194 0
-9191 -9192  9193 -132 -9195 0
-9191 -9192  9193 -132  9196 0

c  -1+1 --> 0
c    ( b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0 ∧  p_132) -> (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧ -b^{6, 23}_0)
c  in CNF:
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_2
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_1
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_0
c  in DIMACS:
-9191  9192 -9193 -132 -9194 0
-9191  9192 -9193 -132 -9195 0
-9191  9192 -9193 -132 -9196 0

c  0+1 --> 1
c    (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧  p_132) -> (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0)
c  in CNF:
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_2
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_1
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨  b^{6, 23}_0
c  in DIMACS:
 9191  9192  9193 -132 -9194 0
 9191  9192  9193 -132 -9195 0
 9191  9192  9193 -132  9196 0

c  1+1 --> 2
c    (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0 ∧  p_132) -> (-b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0)
c  in CNF:
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_2
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨  b^{6, 23}_1
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ -p_132 ∨ -b^{6, 23}_0
c  in DIMACS:
 9191  9192 -9193 -132 -9194 0
 9191  9192 -9193 -132  9195 0
 9191  9192 -9193 -132 -9196 0

c  2+1 --> break 
c    (-b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧  p_132) -> break
c  in CNF:
c     b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 9191 -9192  9193 -132 1162 0


c  2-1 --> 1
c    (-b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧ -p_132) -> (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0)
c  in CNF:
c     b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_2
c     b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_1
c     b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨  b^{6, 23}_0
c  in DIMACS:
 9191 -9192  9193  132 -9194 0
 9191 -9192  9193  132 -9195 0
 9191 -9192  9193  132  9196 0

c  1-1 --> 0
c    (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0 ∧ -p_132) -> (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧ -b^{6, 23}_0)
c  in CNF:
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_2
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_1
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_0
c  in DIMACS:
 9191  9192 -9193  132 -9194 0
 9191  9192 -9193  132 -9195 0
 9191  9192 -9193  132 -9196 0

c  0-1 --> -1
c    (-b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧ -p_132) -> ( b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0)
c  in CNF:
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨  b^{6, 23}_2
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_1
c     b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨  b^{6, 23}_0
c  in DIMACS:
 9191  9192  9193  132  9194 0
 9191  9192  9193  132 -9195 0
 9191  9192  9193  132  9196 0

c  -1-1 --> -2
c    ( b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧  b^{6, 22}_0 ∧ -p_132) -> ( b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0)
c  in CNF:
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨  b^{6, 23}_2
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨  b^{6, 23}_1
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨  p_132 ∨ -b^{6, 23}_0
c  in DIMACS:
-9191  9192 -9193  132  9194 0
-9191  9192 -9193  132  9195 0
-9191  9192 -9193  132 -9196 0

c  -2-1 --> break 
c    ( b^{6, 22}_2 ∧  b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨  b^{6, 22}_0 ∨  p_132 ∨ break
c  in DIMACS:
-9191 -9192  9193  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 22}_2 ∧ -b^{6, 22}_1 ∧ -b^{6, 22}_0 ∧ true) 
c  in CNF:
c    -b^{6, 22}_2 ∨  b^{6, 22}_1 ∨  b^{6, 22}_0 ∨ false 
c  in DIMACS:
-9191  9192  9193  0

c  3 does not represent an automaton state.
c    -(-b^{6, 22}_2 ∧  b^{6, 22}_1 ∧  b^{6, 22}_0 ∧ true) 
c  in CNF:
c     b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ false 
c  in DIMACS:
 9191 -9192 -9193  0
c  -3 does not represent an automaton state.
c    -( b^{6, 22}_2 ∧  b^{6, 22}_1 ∧  b^{6, 22}_0 ∧ true) 
c  in CNF:
c    -b^{6, 22}_2 ∨ -b^{6, 22}_1 ∨ -b^{6, 22}_0 ∨ false 
c  in DIMACS:
-9191 -9192 -9193  0

c i = 23
c  -2+1 --> -1
c    ( b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧  p_138) -> ( b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0)
c  in CNF:
c    -b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨  b^{6, 24}_2
c    -b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_1
c    -b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨  b^{6, 24}_0
c  in DIMACS:
-9194 -9195  9196 -138  9197 0
-9194 -9195  9196 -138 -9198 0
-9194 -9195  9196 -138  9199 0

c  -1+1 --> 0
c    ( b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0 ∧  p_138) -> (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧ -b^{6, 24}_0)
c  in CNF:
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_2
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_1
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_0
c  in DIMACS:
-9194  9195 -9196 -138 -9197 0
-9194  9195 -9196 -138 -9198 0
-9194  9195 -9196 -138 -9199 0

c  0+1 --> 1
c    (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧  p_138) -> (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0)
c  in CNF:
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_2
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_1
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨  b^{6, 24}_0
c  in DIMACS:
 9194  9195  9196 -138 -9197 0
 9194  9195  9196 -138 -9198 0
 9194  9195  9196 -138  9199 0

c  1+1 --> 2
c    (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0 ∧  p_138) -> (-b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0)
c  in CNF:
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_2
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨  b^{6, 24}_1
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ -p_138 ∨ -b^{6, 24}_0
c  in DIMACS:
 9194  9195 -9196 -138 -9197 0
 9194  9195 -9196 -138  9198 0
 9194  9195 -9196 -138 -9199 0

c  2+1 --> break 
c    (-b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧  p_138) -> break
c  in CNF:
c     b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 9194 -9195  9196 -138 1162 0


c  2-1 --> 1
c    (-b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧ -p_138) -> (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0)
c  in CNF:
c     b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_2
c     b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_1
c     b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨  b^{6, 24}_0
c  in DIMACS:
 9194 -9195  9196  138 -9197 0
 9194 -9195  9196  138 -9198 0
 9194 -9195  9196  138  9199 0

c  1-1 --> 0
c    (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0 ∧ -p_138) -> (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧ -b^{6, 24}_0)
c  in CNF:
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_2
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_1
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_0
c  in DIMACS:
 9194  9195 -9196  138 -9197 0
 9194  9195 -9196  138 -9198 0
 9194  9195 -9196  138 -9199 0

c  0-1 --> -1
c    (-b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧ -p_138) -> ( b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0)
c  in CNF:
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨  b^{6, 24}_2
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_1
c     b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨  b^{6, 24}_0
c  in DIMACS:
 9194  9195  9196  138  9197 0
 9194  9195  9196  138 -9198 0
 9194  9195  9196  138  9199 0

c  -1-1 --> -2
c    ( b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧  b^{6, 23}_0 ∧ -p_138) -> ( b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0)
c  in CNF:
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨  b^{6, 24}_2
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨  b^{6, 24}_1
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨  p_138 ∨ -b^{6, 24}_0
c  in DIMACS:
-9194  9195 -9196  138  9197 0
-9194  9195 -9196  138  9198 0
-9194  9195 -9196  138 -9199 0

c  -2-1 --> break 
c    ( b^{6, 23}_2 ∧  b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨  b^{6, 23}_0 ∨  p_138 ∨ break
c  in DIMACS:
-9194 -9195  9196  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 23}_2 ∧ -b^{6, 23}_1 ∧ -b^{6, 23}_0 ∧ true) 
c  in CNF:
c    -b^{6, 23}_2 ∨  b^{6, 23}_1 ∨  b^{6, 23}_0 ∨ false 
c  in DIMACS:
-9194  9195  9196  0

c  3 does not represent an automaton state.
c    -(-b^{6, 23}_2 ∧  b^{6, 23}_1 ∧  b^{6, 23}_0 ∧ true) 
c  in CNF:
c     b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ false 
c  in DIMACS:
 9194 -9195 -9196  0
c  -3 does not represent an automaton state.
c    -( b^{6, 23}_2 ∧  b^{6, 23}_1 ∧  b^{6, 23}_0 ∧ true) 
c  in CNF:
c    -b^{6, 23}_2 ∨ -b^{6, 23}_1 ∨ -b^{6, 23}_0 ∨ false 
c  in DIMACS:
-9194 -9195 -9196  0

c i = 24
c  -2+1 --> -1
c    ( b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧  p_144) -> ( b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0)
c  in CNF:
c    -b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨  b^{6, 25}_2
c    -b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_1
c    -b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨  b^{6, 25}_0
c  in DIMACS:
-9197 -9198  9199 -144  9200 0
-9197 -9198  9199 -144 -9201 0
-9197 -9198  9199 -144  9202 0

c  -1+1 --> 0
c    ( b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0 ∧  p_144) -> (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧ -b^{6, 25}_0)
c  in CNF:
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_2
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_1
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_0
c  in DIMACS:
-9197  9198 -9199 -144 -9200 0
-9197  9198 -9199 -144 -9201 0
-9197  9198 -9199 -144 -9202 0

c  0+1 --> 1
c    (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧  p_144) -> (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0)
c  in CNF:
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_2
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_1
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨  b^{6, 25}_0
c  in DIMACS:
 9197  9198  9199 -144 -9200 0
 9197  9198  9199 -144 -9201 0
 9197  9198  9199 -144  9202 0

c  1+1 --> 2
c    (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0 ∧  p_144) -> (-b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0)
c  in CNF:
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_2
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨  b^{6, 25}_1
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ -p_144 ∨ -b^{6, 25}_0
c  in DIMACS:
 9197  9198 -9199 -144 -9200 0
 9197  9198 -9199 -144  9201 0
 9197  9198 -9199 -144 -9202 0

c  2+1 --> break 
c    (-b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧  p_144) -> break
c  in CNF:
c     b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 9197 -9198  9199 -144 1162 0


c  2-1 --> 1
c    (-b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧ -p_144) -> (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0)
c  in CNF:
c     b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_2
c     b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_1
c     b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨  b^{6, 25}_0
c  in DIMACS:
 9197 -9198  9199  144 -9200 0
 9197 -9198  9199  144 -9201 0
 9197 -9198  9199  144  9202 0

c  1-1 --> 0
c    (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0 ∧ -p_144) -> (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧ -b^{6, 25}_0)
c  in CNF:
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_2
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_1
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_0
c  in DIMACS:
 9197  9198 -9199  144 -9200 0
 9197  9198 -9199  144 -9201 0
 9197  9198 -9199  144 -9202 0

c  0-1 --> -1
c    (-b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧ -p_144) -> ( b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0)
c  in CNF:
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨  b^{6, 25}_2
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_1
c     b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨  b^{6, 25}_0
c  in DIMACS:
 9197  9198  9199  144  9200 0
 9197  9198  9199  144 -9201 0
 9197  9198  9199  144  9202 0

c  -1-1 --> -2
c    ( b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧  b^{6, 24}_0 ∧ -p_144) -> ( b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0)
c  in CNF:
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨  b^{6, 25}_2
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨  b^{6, 25}_1
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨  p_144 ∨ -b^{6, 25}_0
c  in DIMACS:
-9197  9198 -9199  144  9200 0
-9197  9198 -9199  144  9201 0
-9197  9198 -9199  144 -9202 0

c  -2-1 --> break 
c    ( b^{6, 24}_2 ∧  b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨  b^{6, 24}_0 ∨  p_144 ∨ break
c  in DIMACS:
-9197 -9198  9199  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 24}_2 ∧ -b^{6, 24}_1 ∧ -b^{6, 24}_0 ∧ true) 
c  in CNF:
c    -b^{6, 24}_2 ∨  b^{6, 24}_1 ∨  b^{6, 24}_0 ∨ false 
c  in DIMACS:
-9197  9198  9199  0

c  3 does not represent an automaton state.
c    -(-b^{6, 24}_2 ∧  b^{6, 24}_1 ∧  b^{6, 24}_0 ∧ true) 
c  in CNF:
c     b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ false 
c  in DIMACS:
 9197 -9198 -9199  0
c  -3 does not represent an automaton state.
c    -( b^{6, 24}_2 ∧  b^{6, 24}_1 ∧  b^{6, 24}_0 ∧ true) 
c  in CNF:
c    -b^{6, 24}_2 ∨ -b^{6, 24}_1 ∨ -b^{6, 24}_0 ∨ false 
c  in DIMACS:
-9197 -9198 -9199  0

c i = 25
c  -2+1 --> -1
c    ( b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧  p_150) -> ( b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0)
c  in CNF:
c    -b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨  b^{6, 26}_2
c    -b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_1
c    -b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨  b^{6, 26}_0
c  in DIMACS:
-9200 -9201  9202 -150  9203 0
-9200 -9201  9202 -150 -9204 0
-9200 -9201  9202 -150  9205 0

c  -1+1 --> 0
c    ( b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0 ∧  p_150) -> (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧ -b^{6, 26}_0)
c  in CNF:
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_2
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_1
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_0
c  in DIMACS:
-9200  9201 -9202 -150 -9203 0
-9200  9201 -9202 -150 -9204 0
-9200  9201 -9202 -150 -9205 0

c  0+1 --> 1
c    (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧  p_150) -> (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0)
c  in CNF:
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_2
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_1
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨  b^{6, 26}_0
c  in DIMACS:
 9200  9201  9202 -150 -9203 0
 9200  9201  9202 -150 -9204 0
 9200  9201  9202 -150  9205 0

c  1+1 --> 2
c    (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0 ∧  p_150) -> (-b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0)
c  in CNF:
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_2
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨  b^{6, 26}_1
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ -p_150 ∨ -b^{6, 26}_0
c  in DIMACS:
 9200  9201 -9202 -150 -9203 0
 9200  9201 -9202 -150  9204 0
 9200  9201 -9202 -150 -9205 0

c  2+1 --> break 
c    (-b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧  p_150) -> break
c  in CNF:
c     b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 9200 -9201  9202 -150 1162 0


c  2-1 --> 1
c    (-b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧ -p_150) -> (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0)
c  in CNF:
c     b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_2
c     b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_1
c     b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨  b^{6, 26}_0
c  in DIMACS:
 9200 -9201  9202  150 -9203 0
 9200 -9201  9202  150 -9204 0
 9200 -9201  9202  150  9205 0

c  1-1 --> 0
c    (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0 ∧ -p_150) -> (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧ -b^{6, 26}_0)
c  in CNF:
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_2
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_1
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_0
c  in DIMACS:
 9200  9201 -9202  150 -9203 0
 9200  9201 -9202  150 -9204 0
 9200  9201 -9202  150 -9205 0

c  0-1 --> -1
c    (-b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧ -p_150) -> ( b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0)
c  in CNF:
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨  b^{6, 26}_2
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_1
c     b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨  b^{6, 26}_0
c  in DIMACS:
 9200  9201  9202  150  9203 0
 9200  9201  9202  150 -9204 0
 9200  9201  9202  150  9205 0

c  -1-1 --> -2
c    ( b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧  b^{6, 25}_0 ∧ -p_150) -> ( b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0)
c  in CNF:
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨  b^{6, 26}_2
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨  b^{6, 26}_1
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨  p_150 ∨ -b^{6, 26}_0
c  in DIMACS:
-9200  9201 -9202  150  9203 0
-9200  9201 -9202  150  9204 0
-9200  9201 -9202  150 -9205 0

c  -2-1 --> break 
c    ( b^{6, 25}_2 ∧  b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨  b^{6, 25}_0 ∨  p_150 ∨ break
c  in DIMACS:
-9200 -9201  9202  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 25}_2 ∧ -b^{6, 25}_1 ∧ -b^{6, 25}_0 ∧ true) 
c  in CNF:
c    -b^{6, 25}_2 ∨  b^{6, 25}_1 ∨  b^{6, 25}_0 ∨ false 
c  in DIMACS:
-9200  9201  9202  0

c  3 does not represent an automaton state.
c    -(-b^{6, 25}_2 ∧  b^{6, 25}_1 ∧  b^{6, 25}_0 ∧ true) 
c  in CNF:
c     b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ false 
c  in DIMACS:
 9200 -9201 -9202  0
c  -3 does not represent an automaton state.
c    -( b^{6, 25}_2 ∧  b^{6, 25}_1 ∧  b^{6, 25}_0 ∧ true) 
c  in CNF:
c    -b^{6, 25}_2 ∨ -b^{6, 25}_1 ∨ -b^{6, 25}_0 ∨ false 
c  in DIMACS:
-9200 -9201 -9202  0

c i = 26
c  -2+1 --> -1
c    ( b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧  p_156) -> ( b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0)
c  in CNF:
c    -b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨  b^{6, 27}_2
c    -b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_1
c    -b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨  b^{6, 27}_0
c  in DIMACS:
-9203 -9204  9205 -156  9206 0
-9203 -9204  9205 -156 -9207 0
-9203 -9204  9205 -156  9208 0

c  -1+1 --> 0
c    ( b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0 ∧  p_156) -> (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧ -b^{6, 27}_0)
c  in CNF:
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_2
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_1
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_0
c  in DIMACS:
-9203  9204 -9205 -156 -9206 0
-9203  9204 -9205 -156 -9207 0
-9203  9204 -9205 -156 -9208 0

c  0+1 --> 1
c    (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧  p_156) -> (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0)
c  in CNF:
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_2
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_1
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨  b^{6, 27}_0
c  in DIMACS:
 9203  9204  9205 -156 -9206 0
 9203  9204  9205 -156 -9207 0
 9203  9204  9205 -156  9208 0

c  1+1 --> 2
c    (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0 ∧  p_156) -> (-b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0)
c  in CNF:
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_2
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨  b^{6, 27}_1
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ -p_156 ∨ -b^{6, 27}_0
c  in DIMACS:
 9203  9204 -9205 -156 -9206 0
 9203  9204 -9205 -156  9207 0
 9203  9204 -9205 -156 -9208 0

c  2+1 --> break 
c    (-b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧  p_156) -> break
c  in CNF:
c     b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 9203 -9204  9205 -156 1162 0


c  2-1 --> 1
c    (-b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧ -p_156) -> (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0)
c  in CNF:
c     b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_2
c     b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_1
c     b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨  b^{6, 27}_0
c  in DIMACS:
 9203 -9204  9205  156 -9206 0
 9203 -9204  9205  156 -9207 0
 9203 -9204  9205  156  9208 0

c  1-1 --> 0
c    (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0 ∧ -p_156) -> (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧ -b^{6, 27}_0)
c  in CNF:
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_2
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_1
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_0
c  in DIMACS:
 9203  9204 -9205  156 -9206 0
 9203  9204 -9205  156 -9207 0
 9203  9204 -9205  156 -9208 0

c  0-1 --> -1
c    (-b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧ -p_156) -> ( b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0)
c  in CNF:
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨  b^{6, 27}_2
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_1
c     b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨  b^{6, 27}_0
c  in DIMACS:
 9203  9204  9205  156  9206 0
 9203  9204  9205  156 -9207 0
 9203  9204  9205  156  9208 0

c  -1-1 --> -2
c    ( b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧  b^{6, 26}_0 ∧ -p_156) -> ( b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0)
c  in CNF:
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨  b^{6, 27}_2
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨  b^{6, 27}_1
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨  p_156 ∨ -b^{6, 27}_0
c  in DIMACS:
-9203  9204 -9205  156  9206 0
-9203  9204 -9205  156  9207 0
-9203  9204 -9205  156 -9208 0

c  -2-1 --> break 
c    ( b^{6, 26}_2 ∧  b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨  b^{6, 26}_0 ∨  p_156 ∨ break
c  in DIMACS:
-9203 -9204  9205  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 26}_2 ∧ -b^{6, 26}_1 ∧ -b^{6, 26}_0 ∧ true) 
c  in CNF:
c    -b^{6, 26}_2 ∨  b^{6, 26}_1 ∨  b^{6, 26}_0 ∨ false 
c  in DIMACS:
-9203  9204  9205  0

c  3 does not represent an automaton state.
c    -(-b^{6, 26}_2 ∧  b^{6, 26}_1 ∧  b^{6, 26}_0 ∧ true) 
c  in CNF:
c     b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ false 
c  in DIMACS:
 9203 -9204 -9205  0
c  -3 does not represent an automaton state.
c    -( b^{6, 26}_2 ∧  b^{6, 26}_1 ∧  b^{6, 26}_0 ∧ true) 
c  in CNF:
c    -b^{6, 26}_2 ∨ -b^{6, 26}_1 ∨ -b^{6, 26}_0 ∨ false 
c  in DIMACS:
-9203 -9204 -9205  0

c i = 27
c  -2+1 --> -1
c    ( b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧  p_162) -> ( b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0)
c  in CNF:
c    -b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨  b^{6, 28}_2
c    -b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_1
c    -b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨  b^{6, 28}_0
c  in DIMACS:
-9206 -9207  9208 -162  9209 0
-9206 -9207  9208 -162 -9210 0
-9206 -9207  9208 -162  9211 0

c  -1+1 --> 0
c    ( b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0 ∧  p_162) -> (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧ -b^{6, 28}_0)
c  in CNF:
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_2
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_1
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_0
c  in DIMACS:
-9206  9207 -9208 -162 -9209 0
-9206  9207 -9208 -162 -9210 0
-9206  9207 -9208 -162 -9211 0

c  0+1 --> 1
c    (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧  p_162) -> (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0)
c  in CNF:
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_2
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_1
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨  b^{6, 28}_0
c  in DIMACS:
 9206  9207  9208 -162 -9209 0
 9206  9207  9208 -162 -9210 0
 9206  9207  9208 -162  9211 0

c  1+1 --> 2
c    (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0 ∧  p_162) -> (-b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0)
c  in CNF:
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_2
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨  b^{6, 28}_1
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ -p_162 ∨ -b^{6, 28}_0
c  in DIMACS:
 9206  9207 -9208 -162 -9209 0
 9206  9207 -9208 -162  9210 0
 9206  9207 -9208 -162 -9211 0

c  2+1 --> break 
c    (-b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧  p_162) -> break
c  in CNF:
c     b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 9206 -9207  9208 -162 1162 0


c  2-1 --> 1
c    (-b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧ -p_162) -> (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0)
c  in CNF:
c     b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_2
c     b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_1
c     b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨  b^{6, 28}_0
c  in DIMACS:
 9206 -9207  9208  162 -9209 0
 9206 -9207  9208  162 -9210 0
 9206 -9207  9208  162  9211 0

c  1-1 --> 0
c    (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0 ∧ -p_162) -> (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧ -b^{6, 28}_0)
c  in CNF:
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_2
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_1
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_0
c  in DIMACS:
 9206  9207 -9208  162 -9209 0
 9206  9207 -9208  162 -9210 0
 9206  9207 -9208  162 -9211 0

c  0-1 --> -1
c    (-b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧ -p_162) -> ( b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0)
c  in CNF:
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨  b^{6, 28}_2
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_1
c     b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨  b^{6, 28}_0
c  in DIMACS:
 9206  9207  9208  162  9209 0
 9206  9207  9208  162 -9210 0
 9206  9207  9208  162  9211 0

c  -1-1 --> -2
c    ( b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧  b^{6, 27}_0 ∧ -p_162) -> ( b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0)
c  in CNF:
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨  b^{6, 28}_2
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨  b^{6, 28}_1
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨  p_162 ∨ -b^{6, 28}_0
c  in DIMACS:
-9206  9207 -9208  162  9209 0
-9206  9207 -9208  162  9210 0
-9206  9207 -9208  162 -9211 0

c  -2-1 --> break 
c    ( b^{6, 27}_2 ∧  b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨  b^{6, 27}_0 ∨  p_162 ∨ break
c  in DIMACS:
-9206 -9207  9208  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 27}_2 ∧ -b^{6, 27}_1 ∧ -b^{6, 27}_0 ∧ true) 
c  in CNF:
c    -b^{6, 27}_2 ∨  b^{6, 27}_1 ∨  b^{6, 27}_0 ∨ false 
c  in DIMACS:
-9206  9207  9208  0

c  3 does not represent an automaton state.
c    -(-b^{6, 27}_2 ∧  b^{6, 27}_1 ∧  b^{6, 27}_0 ∧ true) 
c  in CNF:
c     b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ false 
c  in DIMACS:
 9206 -9207 -9208  0
c  -3 does not represent an automaton state.
c    -( b^{6, 27}_2 ∧  b^{6, 27}_1 ∧  b^{6, 27}_0 ∧ true) 
c  in CNF:
c    -b^{6, 27}_2 ∨ -b^{6, 27}_1 ∨ -b^{6, 27}_0 ∨ false 
c  in DIMACS:
-9206 -9207 -9208  0

c i = 28
c  -2+1 --> -1
c    ( b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧  p_168) -> ( b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0)
c  in CNF:
c    -b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨  b^{6, 29}_2
c    -b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_1
c    -b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨  b^{6, 29}_0
c  in DIMACS:
-9209 -9210  9211 -168  9212 0
-9209 -9210  9211 -168 -9213 0
-9209 -9210  9211 -168  9214 0

c  -1+1 --> 0
c    ( b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0 ∧  p_168) -> (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧ -b^{6, 29}_0)
c  in CNF:
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_2
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_1
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_0
c  in DIMACS:
-9209  9210 -9211 -168 -9212 0
-9209  9210 -9211 -168 -9213 0
-9209  9210 -9211 -168 -9214 0

c  0+1 --> 1
c    (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧  p_168) -> (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0)
c  in CNF:
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_2
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_1
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨  b^{6, 29}_0
c  in DIMACS:
 9209  9210  9211 -168 -9212 0
 9209  9210  9211 -168 -9213 0
 9209  9210  9211 -168  9214 0

c  1+1 --> 2
c    (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0 ∧  p_168) -> (-b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0)
c  in CNF:
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_2
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨  b^{6, 29}_1
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ -p_168 ∨ -b^{6, 29}_0
c  in DIMACS:
 9209  9210 -9211 -168 -9212 0
 9209  9210 -9211 -168  9213 0
 9209  9210 -9211 -168 -9214 0

c  2+1 --> break 
c    (-b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧  p_168) -> break
c  in CNF:
c     b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 9209 -9210  9211 -168 1162 0


c  2-1 --> 1
c    (-b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧ -p_168) -> (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0)
c  in CNF:
c     b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_2
c     b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_1
c     b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨  b^{6, 29}_0
c  in DIMACS:
 9209 -9210  9211  168 -9212 0
 9209 -9210  9211  168 -9213 0
 9209 -9210  9211  168  9214 0

c  1-1 --> 0
c    (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0 ∧ -p_168) -> (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧ -b^{6, 29}_0)
c  in CNF:
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_2
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_1
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_0
c  in DIMACS:
 9209  9210 -9211  168 -9212 0
 9209  9210 -9211  168 -9213 0
 9209  9210 -9211  168 -9214 0

c  0-1 --> -1
c    (-b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧ -p_168) -> ( b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0)
c  in CNF:
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨  b^{6, 29}_2
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_1
c     b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨  b^{6, 29}_0
c  in DIMACS:
 9209  9210  9211  168  9212 0
 9209  9210  9211  168 -9213 0
 9209  9210  9211  168  9214 0

c  -1-1 --> -2
c    ( b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧  b^{6, 28}_0 ∧ -p_168) -> ( b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0)
c  in CNF:
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨  b^{6, 29}_2
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨  b^{6, 29}_1
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨  p_168 ∨ -b^{6, 29}_0
c  in DIMACS:
-9209  9210 -9211  168  9212 0
-9209  9210 -9211  168  9213 0
-9209  9210 -9211  168 -9214 0

c  -2-1 --> break 
c    ( b^{6, 28}_2 ∧  b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨  b^{6, 28}_0 ∨  p_168 ∨ break
c  in DIMACS:
-9209 -9210  9211  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 28}_2 ∧ -b^{6, 28}_1 ∧ -b^{6, 28}_0 ∧ true) 
c  in CNF:
c    -b^{6, 28}_2 ∨  b^{6, 28}_1 ∨  b^{6, 28}_0 ∨ false 
c  in DIMACS:
-9209  9210  9211  0

c  3 does not represent an automaton state.
c    -(-b^{6, 28}_2 ∧  b^{6, 28}_1 ∧  b^{6, 28}_0 ∧ true) 
c  in CNF:
c     b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ false 
c  in DIMACS:
 9209 -9210 -9211  0
c  -3 does not represent an automaton state.
c    -( b^{6, 28}_2 ∧  b^{6, 28}_1 ∧  b^{6, 28}_0 ∧ true) 
c  in CNF:
c    -b^{6, 28}_2 ∨ -b^{6, 28}_1 ∨ -b^{6, 28}_0 ∨ false 
c  in DIMACS:
-9209 -9210 -9211  0

c i = 29
c  -2+1 --> -1
c    ( b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧  p_174) -> ( b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0)
c  in CNF:
c    -b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨  b^{6, 30}_2
c    -b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_1
c    -b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨  b^{6, 30}_0
c  in DIMACS:
-9212 -9213  9214 -174  9215 0
-9212 -9213  9214 -174 -9216 0
-9212 -9213  9214 -174  9217 0

c  -1+1 --> 0
c    ( b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0 ∧  p_174) -> (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧ -b^{6, 30}_0)
c  in CNF:
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_2
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_1
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_0
c  in DIMACS:
-9212  9213 -9214 -174 -9215 0
-9212  9213 -9214 -174 -9216 0
-9212  9213 -9214 -174 -9217 0

c  0+1 --> 1
c    (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧  p_174) -> (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0)
c  in CNF:
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_2
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_1
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨  b^{6, 30}_0
c  in DIMACS:
 9212  9213  9214 -174 -9215 0
 9212  9213  9214 -174 -9216 0
 9212  9213  9214 -174  9217 0

c  1+1 --> 2
c    (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0 ∧  p_174) -> (-b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0)
c  in CNF:
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_2
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨  b^{6, 30}_1
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ -p_174 ∨ -b^{6, 30}_0
c  in DIMACS:
 9212  9213 -9214 -174 -9215 0
 9212  9213 -9214 -174  9216 0
 9212  9213 -9214 -174 -9217 0

c  2+1 --> break 
c    (-b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧  p_174) -> break
c  in CNF:
c     b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 9212 -9213  9214 -174 1162 0


c  2-1 --> 1
c    (-b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧ -p_174) -> (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0)
c  in CNF:
c     b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_2
c     b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_1
c     b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨  b^{6, 30}_0
c  in DIMACS:
 9212 -9213  9214  174 -9215 0
 9212 -9213  9214  174 -9216 0
 9212 -9213  9214  174  9217 0

c  1-1 --> 0
c    (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0 ∧ -p_174) -> (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧ -b^{6, 30}_0)
c  in CNF:
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_2
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_1
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_0
c  in DIMACS:
 9212  9213 -9214  174 -9215 0
 9212  9213 -9214  174 -9216 0
 9212  9213 -9214  174 -9217 0

c  0-1 --> -1
c    (-b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧ -p_174) -> ( b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0)
c  in CNF:
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨  b^{6, 30}_2
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_1
c     b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨  b^{6, 30}_0
c  in DIMACS:
 9212  9213  9214  174  9215 0
 9212  9213  9214  174 -9216 0
 9212  9213  9214  174  9217 0

c  -1-1 --> -2
c    ( b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧  b^{6, 29}_0 ∧ -p_174) -> ( b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0)
c  in CNF:
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨  b^{6, 30}_2
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨  b^{6, 30}_1
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨  p_174 ∨ -b^{6, 30}_0
c  in DIMACS:
-9212  9213 -9214  174  9215 0
-9212  9213 -9214  174  9216 0
-9212  9213 -9214  174 -9217 0

c  -2-1 --> break 
c    ( b^{6, 29}_2 ∧  b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨  b^{6, 29}_0 ∨  p_174 ∨ break
c  in DIMACS:
-9212 -9213  9214  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 29}_2 ∧ -b^{6, 29}_1 ∧ -b^{6, 29}_0 ∧ true) 
c  in CNF:
c    -b^{6, 29}_2 ∨  b^{6, 29}_1 ∨  b^{6, 29}_0 ∨ false 
c  in DIMACS:
-9212  9213  9214  0

c  3 does not represent an automaton state.
c    -(-b^{6, 29}_2 ∧  b^{6, 29}_1 ∧  b^{6, 29}_0 ∧ true) 
c  in CNF:
c     b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ false 
c  in DIMACS:
 9212 -9213 -9214  0
c  -3 does not represent an automaton state.
c    -( b^{6, 29}_2 ∧  b^{6, 29}_1 ∧  b^{6, 29}_0 ∧ true) 
c  in CNF:
c    -b^{6, 29}_2 ∨ -b^{6, 29}_1 ∨ -b^{6, 29}_0 ∨ false 
c  in DIMACS:
-9212 -9213 -9214  0

c i = 30
c  -2+1 --> -1
c    ( b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧  p_180) -> ( b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0)
c  in CNF:
c    -b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨  b^{6, 31}_2
c    -b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_1
c    -b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨  b^{6, 31}_0
c  in DIMACS:
-9215 -9216  9217 -180  9218 0
-9215 -9216  9217 -180 -9219 0
-9215 -9216  9217 -180  9220 0

c  -1+1 --> 0
c    ( b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0 ∧  p_180) -> (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧ -b^{6, 31}_0)
c  in CNF:
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_2
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_1
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_0
c  in DIMACS:
-9215  9216 -9217 -180 -9218 0
-9215  9216 -9217 -180 -9219 0
-9215  9216 -9217 -180 -9220 0

c  0+1 --> 1
c    (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧  p_180) -> (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0)
c  in CNF:
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_2
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_1
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨  b^{6, 31}_0
c  in DIMACS:
 9215  9216  9217 -180 -9218 0
 9215  9216  9217 -180 -9219 0
 9215  9216  9217 -180  9220 0

c  1+1 --> 2
c    (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0 ∧  p_180) -> (-b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0)
c  in CNF:
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_2
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨  b^{6, 31}_1
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ -p_180 ∨ -b^{6, 31}_0
c  in DIMACS:
 9215  9216 -9217 -180 -9218 0
 9215  9216 -9217 -180  9219 0
 9215  9216 -9217 -180 -9220 0

c  2+1 --> break 
c    (-b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧  p_180) -> break
c  in CNF:
c     b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 9215 -9216  9217 -180 1162 0


c  2-1 --> 1
c    (-b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧ -p_180) -> (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0)
c  in CNF:
c     b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_2
c     b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_1
c     b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨  b^{6, 31}_0
c  in DIMACS:
 9215 -9216  9217  180 -9218 0
 9215 -9216  9217  180 -9219 0
 9215 -9216  9217  180  9220 0

c  1-1 --> 0
c    (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0 ∧ -p_180) -> (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧ -b^{6, 31}_0)
c  in CNF:
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_2
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_1
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_0
c  in DIMACS:
 9215  9216 -9217  180 -9218 0
 9215  9216 -9217  180 -9219 0
 9215  9216 -9217  180 -9220 0

c  0-1 --> -1
c    (-b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧ -p_180) -> ( b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0)
c  in CNF:
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨  b^{6, 31}_2
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_1
c     b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨  b^{6, 31}_0
c  in DIMACS:
 9215  9216  9217  180  9218 0
 9215  9216  9217  180 -9219 0
 9215  9216  9217  180  9220 0

c  -1-1 --> -2
c    ( b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧  b^{6, 30}_0 ∧ -p_180) -> ( b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0)
c  in CNF:
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨  b^{6, 31}_2
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨  b^{6, 31}_1
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨  p_180 ∨ -b^{6, 31}_0
c  in DIMACS:
-9215  9216 -9217  180  9218 0
-9215  9216 -9217  180  9219 0
-9215  9216 -9217  180 -9220 0

c  -2-1 --> break 
c    ( b^{6, 30}_2 ∧  b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨  b^{6, 30}_0 ∨  p_180 ∨ break
c  in DIMACS:
-9215 -9216  9217  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 30}_2 ∧ -b^{6, 30}_1 ∧ -b^{6, 30}_0 ∧ true) 
c  in CNF:
c    -b^{6, 30}_2 ∨  b^{6, 30}_1 ∨  b^{6, 30}_0 ∨ false 
c  in DIMACS:
-9215  9216  9217  0

c  3 does not represent an automaton state.
c    -(-b^{6, 30}_2 ∧  b^{6, 30}_1 ∧  b^{6, 30}_0 ∧ true) 
c  in CNF:
c     b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ false 
c  in DIMACS:
 9215 -9216 -9217  0
c  -3 does not represent an automaton state.
c    -( b^{6, 30}_2 ∧  b^{6, 30}_1 ∧  b^{6, 30}_0 ∧ true) 
c  in CNF:
c    -b^{6, 30}_2 ∨ -b^{6, 30}_1 ∨ -b^{6, 30}_0 ∨ false 
c  in DIMACS:
-9215 -9216 -9217  0

c i = 31
c  -2+1 --> -1
c    ( b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧  p_186) -> ( b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0)
c  in CNF:
c    -b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨  b^{6, 32}_2
c    -b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_1
c    -b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨  b^{6, 32}_0
c  in DIMACS:
-9218 -9219  9220 -186  9221 0
-9218 -9219  9220 -186 -9222 0
-9218 -9219  9220 -186  9223 0

c  -1+1 --> 0
c    ( b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0 ∧  p_186) -> (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧ -b^{6, 32}_0)
c  in CNF:
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_2
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_1
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_0
c  in DIMACS:
-9218  9219 -9220 -186 -9221 0
-9218  9219 -9220 -186 -9222 0
-9218  9219 -9220 -186 -9223 0

c  0+1 --> 1
c    (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧  p_186) -> (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0)
c  in CNF:
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_2
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_1
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨  b^{6, 32}_0
c  in DIMACS:
 9218  9219  9220 -186 -9221 0
 9218  9219  9220 -186 -9222 0
 9218  9219  9220 -186  9223 0

c  1+1 --> 2
c    (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0 ∧  p_186) -> (-b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0)
c  in CNF:
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_2
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨  b^{6, 32}_1
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ -p_186 ∨ -b^{6, 32}_0
c  in DIMACS:
 9218  9219 -9220 -186 -9221 0
 9218  9219 -9220 -186  9222 0
 9218  9219 -9220 -186 -9223 0

c  2+1 --> break 
c    (-b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧  p_186) -> break
c  in CNF:
c     b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 9218 -9219  9220 -186 1162 0


c  2-1 --> 1
c    (-b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧ -p_186) -> (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0)
c  in CNF:
c     b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_2
c     b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_1
c     b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨  b^{6, 32}_0
c  in DIMACS:
 9218 -9219  9220  186 -9221 0
 9218 -9219  9220  186 -9222 0
 9218 -9219  9220  186  9223 0

c  1-1 --> 0
c    (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0 ∧ -p_186) -> (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧ -b^{6, 32}_0)
c  in CNF:
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_2
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_1
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_0
c  in DIMACS:
 9218  9219 -9220  186 -9221 0
 9218  9219 -9220  186 -9222 0
 9218  9219 -9220  186 -9223 0

c  0-1 --> -1
c    (-b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧ -p_186) -> ( b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0)
c  in CNF:
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨  b^{6, 32}_2
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_1
c     b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨  b^{6, 32}_0
c  in DIMACS:
 9218  9219  9220  186  9221 0
 9218  9219  9220  186 -9222 0
 9218  9219  9220  186  9223 0

c  -1-1 --> -2
c    ( b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧  b^{6, 31}_0 ∧ -p_186) -> ( b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0)
c  in CNF:
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨  b^{6, 32}_2
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨  b^{6, 32}_1
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨  p_186 ∨ -b^{6, 32}_0
c  in DIMACS:
-9218  9219 -9220  186  9221 0
-9218  9219 -9220  186  9222 0
-9218  9219 -9220  186 -9223 0

c  -2-1 --> break 
c    ( b^{6, 31}_2 ∧  b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨  b^{6, 31}_0 ∨  p_186 ∨ break
c  in DIMACS:
-9218 -9219  9220  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 31}_2 ∧ -b^{6, 31}_1 ∧ -b^{6, 31}_0 ∧ true) 
c  in CNF:
c    -b^{6, 31}_2 ∨  b^{6, 31}_1 ∨  b^{6, 31}_0 ∨ false 
c  in DIMACS:
-9218  9219  9220  0

c  3 does not represent an automaton state.
c    -(-b^{6, 31}_2 ∧  b^{6, 31}_1 ∧  b^{6, 31}_0 ∧ true) 
c  in CNF:
c     b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ false 
c  in DIMACS:
 9218 -9219 -9220  0
c  -3 does not represent an automaton state.
c    -( b^{6, 31}_2 ∧  b^{6, 31}_1 ∧  b^{6, 31}_0 ∧ true) 
c  in CNF:
c    -b^{6, 31}_2 ∨ -b^{6, 31}_1 ∨ -b^{6, 31}_0 ∨ false 
c  in DIMACS:
-9218 -9219 -9220  0

c i = 32
c  -2+1 --> -1
c    ( b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧  p_192) -> ( b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0)
c  in CNF:
c    -b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨  b^{6, 33}_2
c    -b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_1
c    -b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨  b^{6, 33}_0
c  in DIMACS:
-9221 -9222  9223 -192  9224 0
-9221 -9222  9223 -192 -9225 0
-9221 -9222  9223 -192  9226 0

c  -1+1 --> 0
c    ( b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0 ∧  p_192) -> (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧ -b^{6, 33}_0)
c  in CNF:
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_2
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_1
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_0
c  in DIMACS:
-9221  9222 -9223 -192 -9224 0
-9221  9222 -9223 -192 -9225 0
-9221  9222 -9223 -192 -9226 0

c  0+1 --> 1
c    (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧  p_192) -> (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0)
c  in CNF:
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_2
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_1
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨  b^{6, 33}_0
c  in DIMACS:
 9221  9222  9223 -192 -9224 0
 9221  9222  9223 -192 -9225 0
 9221  9222  9223 -192  9226 0

c  1+1 --> 2
c    (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0 ∧  p_192) -> (-b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0)
c  in CNF:
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_2
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨  b^{6, 33}_1
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ -p_192 ∨ -b^{6, 33}_0
c  in DIMACS:
 9221  9222 -9223 -192 -9224 0
 9221  9222 -9223 -192  9225 0
 9221  9222 -9223 -192 -9226 0

c  2+1 --> break 
c    (-b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧  p_192) -> break
c  in CNF:
c     b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 9221 -9222  9223 -192 1162 0


c  2-1 --> 1
c    (-b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧ -p_192) -> (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0)
c  in CNF:
c     b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_2
c     b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_1
c     b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨  b^{6, 33}_0
c  in DIMACS:
 9221 -9222  9223  192 -9224 0
 9221 -9222  9223  192 -9225 0
 9221 -9222  9223  192  9226 0

c  1-1 --> 0
c    (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0 ∧ -p_192) -> (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧ -b^{6, 33}_0)
c  in CNF:
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_2
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_1
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_0
c  in DIMACS:
 9221  9222 -9223  192 -9224 0
 9221  9222 -9223  192 -9225 0
 9221  9222 -9223  192 -9226 0

c  0-1 --> -1
c    (-b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧ -p_192) -> ( b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0)
c  in CNF:
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨  b^{6, 33}_2
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_1
c     b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨  b^{6, 33}_0
c  in DIMACS:
 9221  9222  9223  192  9224 0
 9221  9222  9223  192 -9225 0
 9221  9222  9223  192  9226 0

c  -1-1 --> -2
c    ( b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧  b^{6, 32}_0 ∧ -p_192) -> ( b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0)
c  in CNF:
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨  b^{6, 33}_2
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨  b^{6, 33}_1
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨  p_192 ∨ -b^{6, 33}_0
c  in DIMACS:
-9221  9222 -9223  192  9224 0
-9221  9222 -9223  192  9225 0
-9221  9222 -9223  192 -9226 0

c  -2-1 --> break 
c    ( b^{6, 32}_2 ∧  b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨  b^{6, 32}_0 ∨  p_192 ∨ break
c  in DIMACS:
-9221 -9222  9223  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 32}_2 ∧ -b^{6, 32}_1 ∧ -b^{6, 32}_0 ∧ true) 
c  in CNF:
c    -b^{6, 32}_2 ∨  b^{6, 32}_1 ∨  b^{6, 32}_0 ∨ false 
c  in DIMACS:
-9221  9222  9223  0

c  3 does not represent an automaton state.
c    -(-b^{6, 32}_2 ∧  b^{6, 32}_1 ∧  b^{6, 32}_0 ∧ true) 
c  in CNF:
c     b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ false 
c  in DIMACS:
 9221 -9222 -9223  0
c  -3 does not represent an automaton state.
c    -( b^{6, 32}_2 ∧  b^{6, 32}_1 ∧  b^{6, 32}_0 ∧ true) 
c  in CNF:
c    -b^{6, 32}_2 ∨ -b^{6, 32}_1 ∨ -b^{6, 32}_0 ∨ false 
c  in DIMACS:
-9221 -9222 -9223  0

c i = 33
c  -2+1 --> -1
c    ( b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧  p_198) -> ( b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0)
c  in CNF:
c    -b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨  b^{6, 34}_2
c    -b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_1
c    -b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨  b^{6, 34}_0
c  in DIMACS:
-9224 -9225  9226 -198  9227 0
-9224 -9225  9226 -198 -9228 0
-9224 -9225  9226 -198  9229 0

c  -1+1 --> 0
c    ( b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0 ∧  p_198) -> (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧ -b^{6, 34}_0)
c  in CNF:
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_2
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_1
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_0
c  in DIMACS:
-9224  9225 -9226 -198 -9227 0
-9224  9225 -9226 -198 -9228 0
-9224  9225 -9226 -198 -9229 0

c  0+1 --> 1
c    (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧  p_198) -> (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0)
c  in CNF:
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_2
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_1
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨  b^{6, 34}_0
c  in DIMACS:
 9224  9225  9226 -198 -9227 0
 9224  9225  9226 -198 -9228 0
 9224  9225  9226 -198  9229 0

c  1+1 --> 2
c    (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0 ∧  p_198) -> (-b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0)
c  in CNF:
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_2
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨  b^{6, 34}_1
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ -p_198 ∨ -b^{6, 34}_0
c  in DIMACS:
 9224  9225 -9226 -198 -9227 0
 9224  9225 -9226 -198  9228 0
 9224  9225 -9226 -198 -9229 0

c  2+1 --> break 
c    (-b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧  p_198) -> break
c  in CNF:
c     b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 9224 -9225  9226 -198 1162 0


c  2-1 --> 1
c    (-b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧ -p_198) -> (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0)
c  in CNF:
c     b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_2
c     b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_1
c     b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨  b^{6, 34}_0
c  in DIMACS:
 9224 -9225  9226  198 -9227 0
 9224 -9225  9226  198 -9228 0
 9224 -9225  9226  198  9229 0

c  1-1 --> 0
c    (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0 ∧ -p_198) -> (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧ -b^{6, 34}_0)
c  in CNF:
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_2
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_1
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_0
c  in DIMACS:
 9224  9225 -9226  198 -9227 0
 9224  9225 -9226  198 -9228 0
 9224  9225 -9226  198 -9229 0

c  0-1 --> -1
c    (-b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧ -p_198) -> ( b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0)
c  in CNF:
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨  b^{6, 34}_2
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_1
c     b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨  b^{6, 34}_0
c  in DIMACS:
 9224  9225  9226  198  9227 0
 9224  9225  9226  198 -9228 0
 9224  9225  9226  198  9229 0

c  -1-1 --> -2
c    ( b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧  b^{6, 33}_0 ∧ -p_198) -> ( b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0)
c  in CNF:
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨  b^{6, 34}_2
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨  b^{6, 34}_1
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨  p_198 ∨ -b^{6, 34}_0
c  in DIMACS:
-9224  9225 -9226  198  9227 0
-9224  9225 -9226  198  9228 0
-9224  9225 -9226  198 -9229 0

c  -2-1 --> break 
c    ( b^{6, 33}_2 ∧  b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨  b^{6, 33}_0 ∨  p_198 ∨ break
c  in DIMACS:
-9224 -9225  9226  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 33}_2 ∧ -b^{6, 33}_1 ∧ -b^{6, 33}_0 ∧ true) 
c  in CNF:
c    -b^{6, 33}_2 ∨  b^{6, 33}_1 ∨  b^{6, 33}_0 ∨ false 
c  in DIMACS:
-9224  9225  9226  0

c  3 does not represent an automaton state.
c    -(-b^{6, 33}_2 ∧  b^{6, 33}_1 ∧  b^{6, 33}_0 ∧ true) 
c  in CNF:
c     b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ false 
c  in DIMACS:
 9224 -9225 -9226  0
c  -3 does not represent an automaton state.
c    -( b^{6, 33}_2 ∧  b^{6, 33}_1 ∧  b^{6, 33}_0 ∧ true) 
c  in CNF:
c    -b^{6, 33}_2 ∨ -b^{6, 33}_1 ∨ -b^{6, 33}_0 ∨ false 
c  in DIMACS:
-9224 -9225 -9226  0

c i = 34
c  -2+1 --> -1
c    ( b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧  p_204) -> ( b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0)
c  in CNF:
c    -b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨  b^{6, 35}_2
c    -b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_1
c    -b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨  b^{6, 35}_0
c  in DIMACS:
-9227 -9228  9229 -204  9230 0
-9227 -9228  9229 -204 -9231 0
-9227 -9228  9229 -204  9232 0

c  -1+1 --> 0
c    ( b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0 ∧  p_204) -> (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧ -b^{6, 35}_0)
c  in CNF:
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_2
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_1
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_0
c  in DIMACS:
-9227  9228 -9229 -204 -9230 0
-9227  9228 -9229 -204 -9231 0
-9227  9228 -9229 -204 -9232 0

c  0+1 --> 1
c    (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧  p_204) -> (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0)
c  in CNF:
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_2
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_1
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨  b^{6, 35}_0
c  in DIMACS:
 9227  9228  9229 -204 -9230 0
 9227  9228  9229 -204 -9231 0
 9227  9228  9229 -204  9232 0

c  1+1 --> 2
c    (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0 ∧  p_204) -> (-b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0)
c  in CNF:
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_2
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨  b^{6, 35}_1
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ -p_204 ∨ -b^{6, 35}_0
c  in DIMACS:
 9227  9228 -9229 -204 -9230 0
 9227  9228 -9229 -204  9231 0
 9227  9228 -9229 -204 -9232 0

c  2+1 --> break 
c    (-b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧  p_204) -> break
c  in CNF:
c     b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 9227 -9228  9229 -204 1162 0


c  2-1 --> 1
c    (-b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧ -p_204) -> (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0)
c  in CNF:
c     b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_2
c     b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_1
c     b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨  b^{6, 35}_0
c  in DIMACS:
 9227 -9228  9229  204 -9230 0
 9227 -9228  9229  204 -9231 0
 9227 -9228  9229  204  9232 0

c  1-1 --> 0
c    (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0 ∧ -p_204) -> (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧ -b^{6, 35}_0)
c  in CNF:
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_2
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_1
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_0
c  in DIMACS:
 9227  9228 -9229  204 -9230 0
 9227  9228 -9229  204 -9231 0
 9227  9228 -9229  204 -9232 0

c  0-1 --> -1
c    (-b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧ -p_204) -> ( b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0)
c  in CNF:
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨  b^{6, 35}_2
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_1
c     b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨  b^{6, 35}_0
c  in DIMACS:
 9227  9228  9229  204  9230 0
 9227  9228  9229  204 -9231 0
 9227  9228  9229  204  9232 0

c  -1-1 --> -2
c    ( b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧  b^{6, 34}_0 ∧ -p_204) -> ( b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0)
c  in CNF:
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨  b^{6, 35}_2
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨  b^{6, 35}_1
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨  p_204 ∨ -b^{6, 35}_0
c  in DIMACS:
-9227  9228 -9229  204  9230 0
-9227  9228 -9229  204  9231 0
-9227  9228 -9229  204 -9232 0

c  -2-1 --> break 
c    ( b^{6, 34}_2 ∧  b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨  b^{6, 34}_0 ∨  p_204 ∨ break
c  in DIMACS:
-9227 -9228  9229  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 34}_2 ∧ -b^{6, 34}_1 ∧ -b^{6, 34}_0 ∧ true) 
c  in CNF:
c    -b^{6, 34}_2 ∨  b^{6, 34}_1 ∨  b^{6, 34}_0 ∨ false 
c  in DIMACS:
-9227  9228  9229  0

c  3 does not represent an automaton state.
c    -(-b^{6, 34}_2 ∧  b^{6, 34}_1 ∧  b^{6, 34}_0 ∧ true) 
c  in CNF:
c     b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ false 
c  in DIMACS:
 9227 -9228 -9229  0
c  -3 does not represent an automaton state.
c    -( b^{6, 34}_2 ∧  b^{6, 34}_1 ∧  b^{6, 34}_0 ∧ true) 
c  in CNF:
c    -b^{6, 34}_2 ∨ -b^{6, 34}_1 ∨ -b^{6, 34}_0 ∨ false 
c  in DIMACS:
-9227 -9228 -9229  0

c i = 35
c  -2+1 --> -1
c    ( b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧  p_210) -> ( b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0)
c  in CNF:
c    -b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨  b^{6, 36}_2
c    -b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_1
c    -b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨  b^{6, 36}_0
c  in DIMACS:
-9230 -9231  9232 -210  9233 0
-9230 -9231  9232 -210 -9234 0
-9230 -9231  9232 -210  9235 0

c  -1+1 --> 0
c    ( b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0 ∧  p_210) -> (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧ -b^{6, 36}_0)
c  in CNF:
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_2
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_1
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_0
c  in DIMACS:
-9230  9231 -9232 -210 -9233 0
-9230  9231 -9232 -210 -9234 0
-9230  9231 -9232 -210 -9235 0

c  0+1 --> 1
c    (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧  p_210) -> (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0)
c  in CNF:
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_2
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_1
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨  b^{6, 36}_0
c  in DIMACS:
 9230  9231  9232 -210 -9233 0
 9230  9231  9232 -210 -9234 0
 9230  9231  9232 -210  9235 0

c  1+1 --> 2
c    (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0 ∧  p_210) -> (-b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0)
c  in CNF:
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_2
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨  b^{6, 36}_1
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ -p_210 ∨ -b^{6, 36}_0
c  in DIMACS:
 9230  9231 -9232 -210 -9233 0
 9230  9231 -9232 -210  9234 0
 9230  9231 -9232 -210 -9235 0

c  2+1 --> break 
c    (-b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧  p_210) -> break
c  in CNF:
c     b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 9230 -9231  9232 -210 1162 0


c  2-1 --> 1
c    (-b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧ -p_210) -> (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0)
c  in CNF:
c     b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_2
c     b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_1
c     b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨  b^{6, 36}_0
c  in DIMACS:
 9230 -9231  9232  210 -9233 0
 9230 -9231  9232  210 -9234 0
 9230 -9231  9232  210  9235 0

c  1-1 --> 0
c    (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0 ∧ -p_210) -> (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧ -b^{6, 36}_0)
c  in CNF:
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_2
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_1
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_0
c  in DIMACS:
 9230  9231 -9232  210 -9233 0
 9230  9231 -9232  210 -9234 0
 9230  9231 -9232  210 -9235 0

c  0-1 --> -1
c    (-b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧ -p_210) -> ( b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0)
c  in CNF:
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨  b^{6, 36}_2
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_1
c     b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨  b^{6, 36}_0
c  in DIMACS:
 9230  9231  9232  210  9233 0
 9230  9231  9232  210 -9234 0
 9230  9231  9232  210  9235 0

c  -1-1 --> -2
c    ( b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧  b^{6, 35}_0 ∧ -p_210) -> ( b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0)
c  in CNF:
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨  b^{6, 36}_2
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨  b^{6, 36}_1
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨  p_210 ∨ -b^{6, 36}_0
c  in DIMACS:
-9230  9231 -9232  210  9233 0
-9230  9231 -9232  210  9234 0
-9230  9231 -9232  210 -9235 0

c  -2-1 --> break 
c    ( b^{6, 35}_2 ∧  b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨  b^{6, 35}_0 ∨  p_210 ∨ break
c  in DIMACS:
-9230 -9231  9232  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 35}_2 ∧ -b^{6, 35}_1 ∧ -b^{6, 35}_0 ∧ true) 
c  in CNF:
c    -b^{6, 35}_2 ∨  b^{6, 35}_1 ∨  b^{6, 35}_0 ∨ false 
c  in DIMACS:
-9230  9231  9232  0

c  3 does not represent an automaton state.
c    -(-b^{6, 35}_2 ∧  b^{6, 35}_1 ∧  b^{6, 35}_0 ∧ true) 
c  in CNF:
c     b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ false 
c  in DIMACS:
 9230 -9231 -9232  0
c  -3 does not represent an automaton state.
c    -( b^{6, 35}_2 ∧  b^{6, 35}_1 ∧  b^{6, 35}_0 ∧ true) 
c  in CNF:
c    -b^{6, 35}_2 ∨ -b^{6, 35}_1 ∨ -b^{6, 35}_0 ∨ false 
c  in DIMACS:
-9230 -9231 -9232  0

c i = 36
c  -2+1 --> -1
c    ( b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧  p_216) -> ( b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0)
c  in CNF:
c    -b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨  b^{6, 37}_2
c    -b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_1
c    -b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨  b^{6, 37}_0
c  in DIMACS:
-9233 -9234  9235 -216  9236 0
-9233 -9234  9235 -216 -9237 0
-9233 -9234  9235 -216  9238 0

c  -1+1 --> 0
c    ( b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0 ∧  p_216) -> (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧ -b^{6, 37}_0)
c  in CNF:
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_2
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_1
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_0
c  in DIMACS:
-9233  9234 -9235 -216 -9236 0
-9233  9234 -9235 -216 -9237 0
-9233  9234 -9235 -216 -9238 0

c  0+1 --> 1
c    (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧  p_216) -> (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0)
c  in CNF:
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_2
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_1
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨  b^{6, 37}_0
c  in DIMACS:
 9233  9234  9235 -216 -9236 0
 9233  9234  9235 -216 -9237 0
 9233  9234  9235 -216  9238 0

c  1+1 --> 2
c    (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0 ∧  p_216) -> (-b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0)
c  in CNF:
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_2
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨  b^{6, 37}_1
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ -p_216 ∨ -b^{6, 37}_0
c  in DIMACS:
 9233  9234 -9235 -216 -9236 0
 9233  9234 -9235 -216  9237 0
 9233  9234 -9235 -216 -9238 0

c  2+1 --> break 
c    (-b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧  p_216) -> break
c  in CNF:
c     b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 9233 -9234  9235 -216 1162 0


c  2-1 --> 1
c    (-b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧ -p_216) -> (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0)
c  in CNF:
c     b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_2
c     b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_1
c     b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨  b^{6, 37}_0
c  in DIMACS:
 9233 -9234  9235  216 -9236 0
 9233 -9234  9235  216 -9237 0
 9233 -9234  9235  216  9238 0

c  1-1 --> 0
c    (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0 ∧ -p_216) -> (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧ -b^{6, 37}_0)
c  in CNF:
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_2
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_1
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_0
c  in DIMACS:
 9233  9234 -9235  216 -9236 0
 9233  9234 -9235  216 -9237 0
 9233  9234 -9235  216 -9238 0

c  0-1 --> -1
c    (-b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧ -p_216) -> ( b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0)
c  in CNF:
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨  b^{6, 37}_2
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_1
c     b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨  b^{6, 37}_0
c  in DIMACS:
 9233  9234  9235  216  9236 0
 9233  9234  9235  216 -9237 0
 9233  9234  9235  216  9238 0

c  -1-1 --> -2
c    ( b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧  b^{6, 36}_0 ∧ -p_216) -> ( b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0)
c  in CNF:
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨  b^{6, 37}_2
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨  b^{6, 37}_1
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨  p_216 ∨ -b^{6, 37}_0
c  in DIMACS:
-9233  9234 -9235  216  9236 0
-9233  9234 -9235  216  9237 0
-9233  9234 -9235  216 -9238 0

c  -2-1 --> break 
c    ( b^{6, 36}_2 ∧  b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨  b^{6, 36}_0 ∨  p_216 ∨ break
c  in DIMACS:
-9233 -9234  9235  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 36}_2 ∧ -b^{6, 36}_1 ∧ -b^{6, 36}_0 ∧ true) 
c  in CNF:
c    -b^{6, 36}_2 ∨  b^{6, 36}_1 ∨  b^{6, 36}_0 ∨ false 
c  in DIMACS:
-9233  9234  9235  0

c  3 does not represent an automaton state.
c    -(-b^{6, 36}_2 ∧  b^{6, 36}_1 ∧  b^{6, 36}_0 ∧ true) 
c  in CNF:
c     b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ false 
c  in DIMACS:
 9233 -9234 -9235  0
c  -3 does not represent an automaton state.
c    -( b^{6, 36}_2 ∧  b^{6, 36}_1 ∧  b^{6, 36}_0 ∧ true) 
c  in CNF:
c    -b^{6, 36}_2 ∨ -b^{6, 36}_1 ∨ -b^{6, 36}_0 ∨ false 
c  in DIMACS:
-9233 -9234 -9235  0

c i = 37
c  -2+1 --> -1
c    ( b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧  p_222) -> ( b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0)
c  in CNF:
c    -b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨  b^{6, 38}_2
c    -b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_1
c    -b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨  b^{6, 38}_0
c  in DIMACS:
-9236 -9237  9238 -222  9239 0
-9236 -9237  9238 -222 -9240 0
-9236 -9237  9238 -222  9241 0

c  -1+1 --> 0
c    ( b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0 ∧  p_222) -> (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧ -b^{6, 38}_0)
c  in CNF:
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_2
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_1
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_0
c  in DIMACS:
-9236  9237 -9238 -222 -9239 0
-9236  9237 -9238 -222 -9240 0
-9236  9237 -9238 -222 -9241 0

c  0+1 --> 1
c    (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧  p_222) -> (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0)
c  in CNF:
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_2
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_1
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨  b^{6, 38}_0
c  in DIMACS:
 9236  9237  9238 -222 -9239 0
 9236  9237  9238 -222 -9240 0
 9236  9237  9238 -222  9241 0

c  1+1 --> 2
c    (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0 ∧  p_222) -> (-b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0)
c  in CNF:
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_2
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨  b^{6, 38}_1
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ -p_222 ∨ -b^{6, 38}_0
c  in DIMACS:
 9236  9237 -9238 -222 -9239 0
 9236  9237 -9238 -222  9240 0
 9236  9237 -9238 -222 -9241 0

c  2+1 --> break 
c    (-b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧  p_222) -> break
c  in CNF:
c     b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 9236 -9237  9238 -222 1162 0


c  2-1 --> 1
c    (-b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧ -p_222) -> (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0)
c  in CNF:
c     b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_2
c     b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_1
c     b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨  b^{6, 38}_0
c  in DIMACS:
 9236 -9237  9238  222 -9239 0
 9236 -9237  9238  222 -9240 0
 9236 -9237  9238  222  9241 0

c  1-1 --> 0
c    (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0 ∧ -p_222) -> (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧ -b^{6, 38}_0)
c  in CNF:
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_2
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_1
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_0
c  in DIMACS:
 9236  9237 -9238  222 -9239 0
 9236  9237 -9238  222 -9240 0
 9236  9237 -9238  222 -9241 0

c  0-1 --> -1
c    (-b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧ -p_222) -> ( b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0)
c  in CNF:
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨  b^{6, 38}_2
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_1
c     b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨  b^{6, 38}_0
c  in DIMACS:
 9236  9237  9238  222  9239 0
 9236  9237  9238  222 -9240 0
 9236  9237  9238  222  9241 0

c  -1-1 --> -2
c    ( b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧  b^{6, 37}_0 ∧ -p_222) -> ( b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0)
c  in CNF:
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨  b^{6, 38}_2
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨  b^{6, 38}_1
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨  p_222 ∨ -b^{6, 38}_0
c  in DIMACS:
-9236  9237 -9238  222  9239 0
-9236  9237 -9238  222  9240 0
-9236  9237 -9238  222 -9241 0

c  -2-1 --> break 
c    ( b^{6, 37}_2 ∧  b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨  b^{6, 37}_0 ∨  p_222 ∨ break
c  in DIMACS:
-9236 -9237  9238  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 37}_2 ∧ -b^{6, 37}_1 ∧ -b^{6, 37}_0 ∧ true) 
c  in CNF:
c    -b^{6, 37}_2 ∨  b^{6, 37}_1 ∨  b^{6, 37}_0 ∨ false 
c  in DIMACS:
-9236  9237  9238  0

c  3 does not represent an automaton state.
c    -(-b^{6, 37}_2 ∧  b^{6, 37}_1 ∧  b^{6, 37}_0 ∧ true) 
c  in CNF:
c     b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ false 
c  in DIMACS:
 9236 -9237 -9238  0
c  -3 does not represent an automaton state.
c    -( b^{6, 37}_2 ∧  b^{6, 37}_1 ∧  b^{6, 37}_0 ∧ true) 
c  in CNF:
c    -b^{6, 37}_2 ∨ -b^{6, 37}_1 ∨ -b^{6, 37}_0 ∨ false 
c  in DIMACS:
-9236 -9237 -9238  0

c i = 38
c  -2+1 --> -1
c    ( b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧  p_228) -> ( b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0)
c  in CNF:
c    -b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨  b^{6, 39}_2
c    -b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_1
c    -b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨  b^{6, 39}_0
c  in DIMACS:
-9239 -9240  9241 -228  9242 0
-9239 -9240  9241 -228 -9243 0
-9239 -9240  9241 -228  9244 0

c  -1+1 --> 0
c    ( b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0 ∧  p_228) -> (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧ -b^{6, 39}_0)
c  in CNF:
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_2
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_1
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_0
c  in DIMACS:
-9239  9240 -9241 -228 -9242 0
-9239  9240 -9241 -228 -9243 0
-9239  9240 -9241 -228 -9244 0

c  0+1 --> 1
c    (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧  p_228) -> (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0)
c  in CNF:
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_2
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_1
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨  b^{6, 39}_0
c  in DIMACS:
 9239  9240  9241 -228 -9242 0
 9239  9240  9241 -228 -9243 0
 9239  9240  9241 -228  9244 0

c  1+1 --> 2
c    (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0 ∧  p_228) -> (-b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0)
c  in CNF:
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_2
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨  b^{6, 39}_1
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ -p_228 ∨ -b^{6, 39}_0
c  in DIMACS:
 9239  9240 -9241 -228 -9242 0
 9239  9240 -9241 -228  9243 0
 9239  9240 -9241 -228 -9244 0

c  2+1 --> break 
c    (-b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧  p_228) -> break
c  in CNF:
c     b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 9239 -9240  9241 -228 1162 0


c  2-1 --> 1
c    (-b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧ -p_228) -> (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0)
c  in CNF:
c     b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_2
c     b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_1
c     b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨  b^{6, 39}_0
c  in DIMACS:
 9239 -9240  9241  228 -9242 0
 9239 -9240  9241  228 -9243 0
 9239 -9240  9241  228  9244 0

c  1-1 --> 0
c    (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0 ∧ -p_228) -> (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧ -b^{6, 39}_0)
c  in CNF:
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_2
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_1
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_0
c  in DIMACS:
 9239  9240 -9241  228 -9242 0
 9239  9240 -9241  228 -9243 0
 9239  9240 -9241  228 -9244 0

c  0-1 --> -1
c    (-b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧ -p_228) -> ( b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0)
c  in CNF:
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨  b^{6, 39}_2
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_1
c     b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨  b^{6, 39}_0
c  in DIMACS:
 9239  9240  9241  228  9242 0
 9239  9240  9241  228 -9243 0
 9239  9240  9241  228  9244 0

c  -1-1 --> -2
c    ( b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧  b^{6, 38}_0 ∧ -p_228) -> ( b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0)
c  in CNF:
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨  b^{6, 39}_2
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨  b^{6, 39}_1
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨  p_228 ∨ -b^{6, 39}_0
c  in DIMACS:
-9239  9240 -9241  228  9242 0
-9239  9240 -9241  228  9243 0
-9239  9240 -9241  228 -9244 0

c  -2-1 --> break 
c    ( b^{6, 38}_2 ∧  b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨  b^{6, 38}_0 ∨  p_228 ∨ break
c  in DIMACS:
-9239 -9240  9241  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 38}_2 ∧ -b^{6, 38}_1 ∧ -b^{6, 38}_0 ∧ true) 
c  in CNF:
c    -b^{6, 38}_2 ∨  b^{6, 38}_1 ∨  b^{6, 38}_0 ∨ false 
c  in DIMACS:
-9239  9240  9241  0

c  3 does not represent an automaton state.
c    -(-b^{6, 38}_2 ∧  b^{6, 38}_1 ∧  b^{6, 38}_0 ∧ true) 
c  in CNF:
c     b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ false 
c  in DIMACS:
 9239 -9240 -9241  0
c  -3 does not represent an automaton state.
c    -( b^{6, 38}_2 ∧  b^{6, 38}_1 ∧  b^{6, 38}_0 ∧ true) 
c  in CNF:
c    -b^{6, 38}_2 ∨ -b^{6, 38}_1 ∨ -b^{6, 38}_0 ∨ false 
c  in DIMACS:
-9239 -9240 -9241  0

c i = 39
c  -2+1 --> -1
c    ( b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧  p_234) -> ( b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0)
c  in CNF:
c    -b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨  b^{6, 40}_2
c    -b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_1
c    -b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨  b^{6, 40}_0
c  in DIMACS:
-9242 -9243  9244 -234  9245 0
-9242 -9243  9244 -234 -9246 0
-9242 -9243  9244 -234  9247 0

c  -1+1 --> 0
c    ( b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0 ∧  p_234) -> (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧ -b^{6, 40}_0)
c  in CNF:
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_2
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_1
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_0
c  in DIMACS:
-9242  9243 -9244 -234 -9245 0
-9242  9243 -9244 -234 -9246 0
-9242  9243 -9244 -234 -9247 0

c  0+1 --> 1
c    (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧  p_234) -> (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0)
c  in CNF:
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_2
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_1
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨  b^{6, 40}_0
c  in DIMACS:
 9242  9243  9244 -234 -9245 0
 9242  9243  9244 -234 -9246 0
 9242  9243  9244 -234  9247 0

c  1+1 --> 2
c    (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0 ∧  p_234) -> (-b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0)
c  in CNF:
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_2
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨  b^{6, 40}_1
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ -p_234 ∨ -b^{6, 40}_0
c  in DIMACS:
 9242  9243 -9244 -234 -9245 0
 9242  9243 -9244 -234  9246 0
 9242  9243 -9244 -234 -9247 0

c  2+1 --> break 
c    (-b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧  p_234) -> break
c  in CNF:
c     b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 9242 -9243  9244 -234 1162 0


c  2-1 --> 1
c    (-b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧ -p_234) -> (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0)
c  in CNF:
c     b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_2
c     b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_1
c     b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨  b^{6, 40}_0
c  in DIMACS:
 9242 -9243  9244  234 -9245 0
 9242 -9243  9244  234 -9246 0
 9242 -9243  9244  234  9247 0

c  1-1 --> 0
c    (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0 ∧ -p_234) -> (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧ -b^{6, 40}_0)
c  in CNF:
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_2
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_1
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_0
c  in DIMACS:
 9242  9243 -9244  234 -9245 0
 9242  9243 -9244  234 -9246 0
 9242  9243 -9244  234 -9247 0

c  0-1 --> -1
c    (-b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧ -p_234) -> ( b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0)
c  in CNF:
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨  b^{6, 40}_2
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_1
c     b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨  b^{6, 40}_0
c  in DIMACS:
 9242  9243  9244  234  9245 0
 9242  9243  9244  234 -9246 0
 9242  9243  9244  234  9247 0

c  -1-1 --> -2
c    ( b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧  b^{6, 39}_0 ∧ -p_234) -> ( b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0)
c  in CNF:
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨  b^{6, 40}_2
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨  b^{6, 40}_1
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨  p_234 ∨ -b^{6, 40}_0
c  in DIMACS:
-9242  9243 -9244  234  9245 0
-9242  9243 -9244  234  9246 0
-9242  9243 -9244  234 -9247 0

c  -2-1 --> break 
c    ( b^{6, 39}_2 ∧  b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨  b^{6, 39}_0 ∨  p_234 ∨ break
c  in DIMACS:
-9242 -9243  9244  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 39}_2 ∧ -b^{6, 39}_1 ∧ -b^{6, 39}_0 ∧ true) 
c  in CNF:
c    -b^{6, 39}_2 ∨  b^{6, 39}_1 ∨  b^{6, 39}_0 ∨ false 
c  in DIMACS:
-9242  9243  9244  0

c  3 does not represent an automaton state.
c    -(-b^{6, 39}_2 ∧  b^{6, 39}_1 ∧  b^{6, 39}_0 ∧ true) 
c  in CNF:
c     b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ false 
c  in DIMACS:
 9242 -9243 -9244  0
c  -3 does not represent an automaton state.
c    -( b^{6, 39}_2 ∧  b^{6, 39}_1 ∧  b^{6, 39}_0 ∧ true) 
c  in CNF:
c    -b^{6, 39}_2 ∨ -b^{6, 39}_1 ∨ -b^{6, 39}_0 ∨ false 
c  in DIMACS:
-9242 -9243 -9244  0

c i = 40
c  -2+1 --> -1
c    ( b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧  p_240) -> ( b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0)
c  in CNF:
c    -b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨  b^{6, 41}_2
c    -b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_1
c    -b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨  b^{6, 41}_0
c  in DIMACS:
-9245 -9246  9247 -240  9248 0
-9245 -9246  9247 -240 -9249 0
-9245 -9246  9247 -240  9250 0

c  -1+1 --> 0
c    ( b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0 ∧  p_240) -> (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧ -b^{6, 41}_0)
c  in CNF:
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_2
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_1
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_0
c  in DIMACS:
-9245  9246 -9247 -240 -9248 0
-9245  9246 -9247 -240 -9249 0
-9245  9246 -9247 -240 -9250 0

c  0+1 --> 1
c    (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧  p_240) -> (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0)
c  in CNF:
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_2
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_1
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨  b^{6, 41}_0
c  in DIMACS:
 9245  9246  9247 -240 -9248 0
 9245  9246  9247 -240 -9249 0
 9245  9246  9247 -240  9250 0

c  1+1 --> 2
c    (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0 ∧  p_240) -> (-b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0)
c  in CNF:
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_2
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨  b^{6, 41}_1
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ -p_240 ∨ -b^{6, 41}_0
c  in DIMACS:
 9245  9246 -9247 -240 -9248 0
 9245  9246 -9247 -240  9249 0
 9245  9246 -9247 -240 -9250 0

c  2+1 --> break 
c    (-b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧  p_240) -> break
c  in CNF:
c     b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 9245 -9246  9247 -240 1162 0


c  2-1 --> 1
c    (-b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧ -p_240) -> (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0)
c  in CNF:
c     b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_2
c     b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_1
c     b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨  b^{6, 41}_0
c  in DIMACS:
 9245 -9246  9247  240 -9248 0
 9245 -9246  9247  240 -9249 0
 9245 -9246  9247  240  9250 0

c  1-1 --> 0
c    (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0 ∧ -p_240) -> (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧ -b^{6, 41}_0)
c  in CNF:
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_2
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_1
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_0
c  in DIMACS:
 9245  9246 -9247  240 -9248 0
 9245  9246 -9247  240 -9249 0
 9245  9246 -9247  240 -9250 0

c  0-1 --> -1
c    (-b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧ -p_240) -> ( b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0)
c  in CNF:
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨  b^{6, 41}_2
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_1
c     b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨  b^{6, 41}_0
c  in DIMACS:
 9245  9246  9247  240  9248 0
 9245  9246  9247  240 -9249 0
 9245  9246  9247  240  9250 0

c  -1-1 --> -2
c    ( b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧  b^{6, 40}_0 ∧ -p_240) -> ( b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0)
c  in CNF:
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨  b^{6, 41}_2
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨  b^{6, 41}_1
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨  p_240 ∨ -b^{6, 41}_0
c  in DIMACS:
-9245  9246 -9247  240  9248 0
-9245  9246 -9247  240  9249 0
-9245  9246 -9247  240 -9250 0

c  -2-1 --> break 
c    ( b^{6, 40}_2 ∧  b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨  b^{6, 40}_0 ∨  p_240 ∨ break
c  in DIMACS:
-9245 -9246  9247  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 40}_2 ∧ -b^{6, 40}_1 ∧ -b^{6, 40}_0 ∧ true) 
c  in CNF:
c    -b^{6, 40}_2 ∨  b^{6, 40}_1 ∨  b^{6, 40}_0 ∨ false 
c  in DIMACS:
-9245  9246  9247  0

c  3 does not represent an automaton state.
c    -(-b^{6, 40}_2 ∧  b^{6, 40}_1 ∧  b^{6, 40}_0 ∧ true) 
c  in CNF:
c     b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ false 
c  in DIMACS:
 9245 -9246 -9247  0
c  -3 does not represent an automaton state.
c    -( b^{6, 40}_2 ∧  b^{6, 40}_1 ∧  b^{6, 40}_0 ∧ true) 
c  in CNF:
c    -b^{6, 40}_2 ∨ -b^{6, 40}_1 ∨ -b^{6, 40}_0 ∨ false 
c  in DIMACS:
-9245 -9246 -9247  0

c i = 41
c  -2+1 --> -1
c    ( b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧  p_246) -> ( b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0)
c  in CNF:
c    -b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨  b^{6, 42}_2
c    -b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_1
c    -b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨  b^{6, 42}_0
c  in DIMACS:
-9248 -9249  9250 -246  9251 0
-9248 -9249  9250 -246 -9252 0
-9248 -9249  9250 -246  9253 0

c  -1+1 --> 0
c    ( b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0 ∧  p_246) -> (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧ -b^{6, 42}_0)
c  in CNF:
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_2
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_1
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_0
c  in DIMACS:
-9248  9249 -9250 -246 -9251 0
-9248  9249 -9250 -246 -9252 0
-9248  9249 -9250 -246 -9253 0

c  0+1 --> 1
c    (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧  p_246) -> (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0)
c  in CNF:
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_2
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_1
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨  b^{6, 42}_0
c  in DIMACS:
 9248  9249  9250 -246 -9251 0
 9248  9249  9250 -246 -9252 0
 9248  9249  9250 -246  9253 0

c  1+1 --> 2
c    (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0 ∧  p_246) -> (-b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0)
c  in CNF:
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_2
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨  b^{6, 42}_1
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ -p_246 ∨ -b^{6, 42}_0
c  in DIMACS:
 9248  9249 -9250 -246 -9251 0
 9248  9249 -9250 -246  9252 0
 9248  9249 -9250 -246 -9253 0

c  2+1 --> break 
c    (-b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧  p_246) -> break
c  in CNF:
c     b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 9248 -9249  9250 -246 1162 0


c  2-1 --> 1
c    (-b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧ -p_246) -> (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0)
c  in CNF:
c     b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_2
c     b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_1
c     b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨  b^{6, 42}_0
c  in DIMACS:
 9248 -9249  9250  246 -9251 0
 9248 -9249  9250  246 -9252 0
 9248 -9249  9250  246  9253 0

c  1-1 --> 0
c    (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0 ∧ -p_246) -> (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧ -b^{6, 42}_0)
c  in CNF:
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_2
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_1
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_0
c  in DIMACS:
 9248  9249 -9250  246 -9251 0
 9248  9249 -9250  246 -9252 0
 9248  9249 -9250  246 -9253 0

c  0-1 --> -1
c    (-b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧ -p_246) -> ( b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0)
c  in CNF:
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨  b^{6, 42}_2
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_1
c     b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨  b^{6, 42}_0
c  in DIMACS:
 9248  9249  9250  246  9251 0
 9248  9249  9250  246 -9252 0
 9248  9249  9250  246  9253 0

c  -1-1 --> -2
c    ( b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧  b^{6, 41}_0 ∧ -p_246) -> ( b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0)
c  in CNF:
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨  b^{6, 42}_2
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨  b^{6, 42}_1
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨  p_246 ∨ -b^{6, 42}_0
c  in DIMACS:
-9248  9249 -9250  246  9251 0
-9248  9249 -9250  246  9252 0
-9248  9249 -9250  246 -9253 0

c  -2-1 --> break 
c    ( b^{6, 41}_2 ∧  b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨  b^{6, 41}_0 ∨  p_246 ∨ break
c  in DIMACS:
-9248 -9249  9250  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 41}_2 ∧ -b^{6, 41}_1 ∧ -b^{6, 41}_0 ∧ true) 
c  in CNF:
c    -b^{6, 41}_2 ∨  b^{6, 41}_1 ∨  b^{6, 41}_0 ∨ false 
c  in DIMACS:
-9248  9249  9250  0

c  3 does not represent an automaton state.
c    -(-b^{6, 41}_2 ∧  b^{6, 41}_1 ∧  b^{6, 41}_0 ∧ true) 
c  in CNF:
c     b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ false 
c  in DIMACS:
 9248 -9249 -9250  0
c  -3 does not represent an automaton state.
c    -( b^{6, 41}_2 ∧  b^{6, 41}_1 ∧  b^{6, 41}_0 ∧ true) 
c  in CNF:
c    -b^{6, 41}_2 ∨ -b^{6, 41}_1 ∨ -b^{6, 41}_0 ∨ false 
c  in DIMACS:
-9248 -9249 -9250  0

c i = 42
c  -2+1 --> -1
c    ( b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧  p_252) -> ( b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0)
c  in CNF:
c    -b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨  b^{6, 43}_2
c    -b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_1
c    -b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨  b^{6, 43}_0
c  in DIMACS:
-9251 -9252  9253 -252  9254 0
-9251 -9252  9253 -252 -9255 0
-9251 -9252  9253 -252  9256 0

c  -1+1 --> 0
c    ( b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0 ∧  p_252) -> (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧ -b^{6, 43}_0)
c  in CNF:
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_2
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_1
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_0
c  in DIMACS:
-9251  9252 -9253 -252 -9254 0
-9251  9252 -9253 -252 -9255 0
-9251  9252 -9253 -252 -9256 0

c  0+1 --> 1
c    (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧  p_252) -> (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0)
c  in CNF:
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_2
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_1
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨  b^{6, 43}_0
c  in DIMACS:
 9251  9252  9253 -252 -9254 0
 9251  9252  9253 -252 -9255 0
 9251  9252  9253 -252  9256 0

c  1+1 --> 2
c    (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0 ∧  p_252) -> (-b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0)
c  in CNF:
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_2
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨  b^{6, 43}_1
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ -p_252 ∨ -b^{6, 43}_0
c  in DIMACS:
 9251  9252 -9253 -252 -9254 0
 9251  9252 -9253 -252  9255 0
 9251  9252 -9253 -252 -9256 0

c  2+1 --> break 
c    (-b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧  p_252) -> break
c  in CNF:
c     b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 9251 -9252  9253 -252 1162 0


c  2-1 --> 1
c    (-b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧ -p_252) -> (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0)
c  in CNF:
c     b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_2
c     b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_1
c     b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨  b^{6, 43}_0
c  in DIMACS:
 9251 -9252  9253  252 -9254 0
 9251 -9252  9253  252 -9255 0
 9251 -9252  9253  252  9256 0

c  1-1 --> 0
c    (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0 ∧ -p_252) -> (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧ -b^{6, 43}_0)
c  in CNF:
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_2
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_1
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_0
c  in DIMACS:
 9251  9252 -9253  252 -9254 0
 9251  9252 -9253  252 -9255 0
 9251  9252 -9253  252 -9256 0

c  0-1 --> -1
c    (-b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧ -p_252) -> ( b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0)
c  in CNF:
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨  b^{6, 43}_2
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_1
c     b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨  b^{6, 43}_0
c  in DIMACS:
 9251  9252  9253  252  9254 0
 9251  9252  9253  252 -9255 0
 9251  9252  9253  252  9256 0

c  -1-1 --> -2
c    ( b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧  b^{6, 42}_0 ∧ -p_252) -> ( b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0)
c  in CNF:
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨  b^{6, 43}_2
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨  b^{6, 43}_1
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨  p_252 ∨ -b^{6, 43}_0
c  in DIMACS:
-9251  9252 -9253  252  9254 0
-9251  9252 -9253  252  9255 0
-9251  9252 -9253  252 -9256 0

c  -2-1 --> break 
c    ( b^{6, 42}_2 ∧  b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨  b^{6, 42}_0 ∨  p_252 ∨ break
c  in DIMACS:
-9251 -9252  9253  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 42}_2 ∧ -b^{6, 42}_1 ∧ -b^{6, 42}_0 ∧ true) 
c  in CNF:
c    -b^{6, 42}_2 ∨  b^{6, 42}_1 ∨  b^{6, 42}_0 ∨ false 
c  in DIMACS:
-9251  9252  9253  0

c  3 does not represent an automaton state.
c    -(-b^{6, 42}_2 ∧  b^{6, 42}_1 ∧  b^{6, 42}_0 ∧ true) 
c  in CNF:
c     b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ false 
c  in DIMACS:
 9251 -9252 -9253  0
c  -3 does not represent an automaton state.
c    -( b^{6, 42}_2 ∧  b^{6, 42}_1 ∧  b^{6, 42}_0 ∧ true) 
c  in CNF:
c    -b^{6, 42}_2 ∨ -b^{6, 42}_1 ∨ -b^{6, 42}_0 ∨ false 
c  in DIMACS:
-9251 -9252 -9253  0

c i = 43
c  -2+1 --> -1
c    ( b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧  p_258) -> ( b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0)
c  in CNF:
c    -b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨  b^{6, 44}_2
c    -b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_1
c    -b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨  b^{6, 44}_0
c  in DIMACS:
-9254 -9255  9256 -258  9257 0
-9254 -9255  9256 -258 -9258 0
-9254 -9255  9256 -258  9259 0

c  -1+1 --> 0
c    ( b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0 ∧  p_258) -> (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧ -b^{6, 44}_0)
c  in CNF:
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_2
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_1
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_0
c  in DIMACS:
-9254  9255 -9256 -258 -9257 0
-9254  9255 -9256 -258 -9258 0
-9254  9255 -9256 -258 -9259 0

c  0+1 --> 1
c    (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧  p_258) -> (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0)
c  in CNF:
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_2
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_1
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨  b^{6, 44}_0
c  in DIMACS:
 9254  9255  9256 -258 -9257 0
 9254  9255  9256 -258 -9258 0
 9254  9255  9256 -258  9259 0

c  1+1 --> 2
c    (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0 ∧  p_258) -> (-b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0)
c  in CNF:
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_2
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨  b^{6, 44}_1
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ -p_258 ∨ -b^{6, 44}_0
c  in DIMACS:
 9254  9255 -9256 -258 -9257 0
 9254  9255 -9256 -258  9258 0
 9254  9255 -9256 -258 -9259 0

c  2+1 --> break 
c    (-b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧  p_258) -> break
c  in CNF:
c     b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 9254 -9255  9256 -258 1162 0


c  2-1 --> 1
c    (-b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧ -p_258) -> (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0)
c  in CNF:
c     b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_2
c     b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_1
c     b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨  b^{6, 44}_0
c  in DIMACS:
 9254 -9255  9256  258 -9257 0
 9254 -9255  9256  258 -9258 0
 9254 -9255  9256  258  9259 0

c  1-1 --> 0
c    (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0 ∧ -p_258) -> (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧ -b^{6, 44}_0)
c  in CNF:
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_2
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_1
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_0
c  in DIMACS:
 9254  9255 -9256  258 -9257 0
 9254  9255 -9256  258 -9258 0
 9254  9255 -9256  258 -9259 0

c  0-1 --> -1
c    (-b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧ -p_258) -> ( b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0)
c  in CNF:
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨  b^{6, 44}_2
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_1
c     b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨  b^{6, 44}_0
c  in DIMACS:
 9254  9255  9256  258  9257 0
 9254  9255  9256  258 -9258 0
 9254  9255  9256  258  9259 0

c  -1-1 --> -2
c    ( b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧  b^{6, 43}_0 ∧ -p_258) -> ( b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0)
c  in CNF:
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨  b^{6, 44}_2
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨  b^{6, 44}_1
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨  p_258 ∨ -b^{6, 44}_0
c  in DIMACS:
-9254  9255 -9256  258  9257 0
-9254  9255 -9256  258  9258 0
-9254  9255 -9256  258 -9259 0

c  -2-1 --> break 
c    ( b^{6, 43}_2 ∧  b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨  b^{6, 43}_0 ∨  p_258 ∨ break
c  in DIMACS:
-9254 -9255  9256  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 43}_2 ∧ -b^{6, 43}_1 ∧ -b^{6, 43}_0 ∧ true) 
c  in CNF:
c    -b^{6, 43}_2 ∨  b^{6, 43}_1 ∨  b^{6, 43}_0 ∨ false 
c  in DIMACS:
-9254  9255  9256  0

c  3 does not represent an automaton state.
c    -(-b^{6, 43}_2 ∧  b^{6, 43}_1 ∧  b^{6, 43}_0 ∧ true) 
c  in CNF:
c     b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ false 
c  in DIMACS:
 9254 -9255 -9256  0
c  -3 does not represent an automaton state.
c    -( b^{6, 43}_2 ∧  b^{6, 43}_1 ∧  b^{6, 43}_0 ∧ true) 
c  in CNF:
c    -b^{6, 43}_2 ∨ -b^{6, 43}_1 ∨ -b^{6, 43}_0 ∨ false 
c  in DIMACS:
-9254 -9255 -9256  0

c i = 44
c  -2+1 --> -1
c    ( b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧  p_264) -> ( b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0)
c  in CNF:
c    -b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨  b^{6, 45}_2
c    -b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_1
c    -b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨  b^{6, 45}_0
c  in DIMACS:
-9257 -9258  9259 -264  9260 0
-9257 -9258  9259 -264 -9261 0
-9257 -9258  9259 -264  9262 0

c  -1+1 --> 0
c    ( b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0 ∧  p_264) -> (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧ -b^{6, 45}_0)
c  in CNF:
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_2
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_1
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_0
c  in DIMACS:
-9257  9258 -9259 -264 -9260 0
-9257  9258 -9259 -264 -9261 0
-9257  9258 -9259 -264 -9262 0

c  0+1 --> 1
c    (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧  p_264) -> (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0)
c  in CNF:
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_2
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_1
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨  b^{6, 45}_0
c  in DIMACS:
 9257  9258  9259 -264 -9260 0
 9257  9258  9259 -264 -9261 0
 9257  9258  9259 -264  9262 0

c  1+1 --> 2
c    (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0 ∧  p_264) -> (-b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0)
c  in CNF:
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_2
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨  b^{6, 45}_1
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ -p_264 ∨ -b^{6, 45}_0
c  in DIMACS:
 9257  9258 -9259 -264 -9260 0
 9257  9258 -9259 -264  9261 0
 9257  9258 -9259 -264 -9262 0

c  2+1 --> break 
c    (-b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧  p_264) -> break
c  in CNF:
c     b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 9257 -9258  9259 -264 1162 0


c  2-1 --> 1
c    (-b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧ -p_264) -> (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0)
c  in CNF:
c     b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_2
c     b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_1
c     b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨  b^{6, 45}_0
c  in DIMACS:
 9257 -9258  9259  264 -9260 0
 9257 -9258  9259  264 -9261 0
 9257 -9258  9259  264  9262 0

c  1-1 --> 0
c    (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0 ∧ -p_264) -> (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧ -b^{6, 45}_0)
c  in CNF:
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_2
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_1
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_0
c  in DIMACS:
 9257  9258 -9259  264 -9260 0
 9257  9258 -9259  264 -9261 0
 9257  9258 -9259  264 -9262 0

c  0-1 --> -1
c    (-b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧ -p_264) -> ( b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0)
c  in CNF:
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨  b^{6, 45}_2
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_1
c     b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨  b^{6, 45}_0
c  in DIMACS:
 9257  9258  9259  264  9260 0
 9257  9258  9259  264 -9261 0
 9257  9258  9259  264  9262 0

c  -1-1 --> -2
c    ( b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧  b^{6, 44}_0 ∧ -p_264) -> ( b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0)
c  in CNF:
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨  b^{6, 45}_2
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨  b^{6, 45}_1
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨  p_264 ∨ -b^{6, 45}_0
c  in DIMACS:
-9257  9258 -9259  264  9260 0
-9257  9258 -9259  264  9261 0
-9257  9258 -9259  264 -9262 0

c  -2-1 --> break 
c    ( b^{6, 44}_2 ∧  b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨  b^{6, 44}_0 ∨  p_264 ∨ break
c  in DIMACS:
-9257 -9258  9259  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 44}_2 ∧ -b^{6, 44}_1 ∧ -b^{6, 44}_0 ∧ true) 
c  in CNF:
c    -b^{6, 44}_2 ∨  b^{6, 44}_1 ∨  b^{6, 44}_0 ∨ false 
c  in DIMACS:
-9257  9258  9259  0

c  3 does not represent an automaton state.
c    -(-b^{6, 44}_2 ∧  b^{6, 44}_1 ∧  b^{6, 44}_0 ∧ true) 
c  in CNF:
c     b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ false 
c  in DIMACS:
 9257 -9258 -9259  0
c  -3 does not represent an automaton state.
c    -( b^{6, 44}_2 ∧  b^{6, 44}_1 ∧  b^{6, 44}_0 ∧ true) 
c  in CNF:
c    -b^{6, 44}_2 ∨ -b^{6, 44}_1 ∨ -b^{6, 44}_0 ∨ false 
c  in DIMACS:
-9257 -9258 -9259  0

c i = 45
c  -2+1 --> -1
c    ( b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧  p_270) -> ( b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0)
c  in CNF:
c    -b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨  b^{6, 46}_2
c    -b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_1
c    -b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨  b^{6, 46}_0
c  in DIMACS:
-9260 -9261  9262 -270  9263 0
-9260 -9261  9262 -270 -9264 0
-9260 -9261  9262 -270  9265 0

c  -1+1 --> 0
c    ( b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0 ∧  p_270) -> (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧ -b^{6, 46}_0)
c  in CNF:
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_2
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_1
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_0
c  in DIMACS:
-9260  9261 -9262 -270 -9263 0
-9260  9261 -9262 -270 -9264 0
-9260  9261 -9262 -270 -9265 0

c  0+1 --> 1
c    (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧  p_270) -> (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0)
c  in CNF:
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_2
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_1
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨  b^{6, 46}_0
c  in DIMACS:
 9260  9261  9262 -270 -9263 0
 9260  9261  9262 -270 -9264 0
 9260  9261  9262 -270  9265 0

c  1+1 --> 2
c    (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0 ∧  p_270) -> (-b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0)
c  in CNF:
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_2
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨  b^{6, 46}_1
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ -p_270 ∨ -b^{6, 46}_0
c  in DIMACS:
 9260  9261 -9262 -270 -9263 0
 9260  9261 -9262 -270  9264 0
 9260  9261 -9262 -270 -9265 0

c  2+1 --> break 
c    (-b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧  p_270) -> break
c  in CNF:
c     b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 9260 -9261  9262 -270 1162 0


c  2-1 --> 1
c    (-b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧ -p_270) -> (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0)
c  in CNF:
c     b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_2
c     b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_1
c     b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨  b^{6, 46}_0
c  in DIMACS:
 9260 -9261  9262  270 -9263 0
 9260 -9261  9262  270 -9264 0
 9260 -9261  9262  270  9265 0

c  1-1 --> 0
c    (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0 ∧ -p_270) -> (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧ -b^{6, 46}_0)
c  in CNF:
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_2
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_1
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_0
c  in DIMACS:
 9260  9261 -9262  270 -9263 0
 9260  9261 -9262  270 -9264 0
 9260  9261 -9262  270 -9265 0

c  0-1 --> -1
c    (-b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧ -p_270) -> ( b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0)
c  in CNF:
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨  b^{6, 46}_2
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_1
c     b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨  b^{6, 46}_0
c  in DIMACS:
 9260  9261  9262  270  9263 0
 9260  9261  9262  270 -9264 0
 9260  9261  9262  270  9265 0

c  -1-1 --> -2
c    ( b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧  b^{6, 45}_0 ∧ -p_270) -> ( b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0)
c  in CNF:
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨  b^{6, 46}_2
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨  b^{6, 46}_1
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨  p_270 ∨ -b^{6, 46}_0
c  in DIMACS:
-9260  9261 -9262  270  9263 0
-9260  9261 -9262  270  9264 0
-9260  9261 -9262  270 -9265 0

c  -2-1 --> break 
c    ( b^{6, 45}_2 ∧  b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨  b^{6, 45}_0 ∨  p_270 ∨ break
c  in DIMACS:
-9260 -9261  9262  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 45}_2 ∧ -b^{6, 45}_1 ∧ -b^{6, 45}_0 ∧ true) 
c  in CNF:
c    -b^{6, 45}_2 ∨  b^{6, 45}_1 ∨  b^{6, 45}_0 ∨ false 
c  in DIMACS:
-9260  9261  9262  0

c  3 does not represent an automaton state.
c    -(-b^{6, 45}_2 ∧  b^{6, 45}_1 ∧  b^{6, 45}_0 ∧ true) 
c  in CNF:
c     b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ false 
c  in DIMACS:
 9260 -9261 -9262  0
c  -3 does not represent an automaton state.
c    -( b^{6, 45}_2 ∧  b^{6, 45}_1 ∧  b^{6, 45}_0 ∧ true) 
c  in CNF:
c    -b^{6, 45}_2 ∨ -b^{6, 45}_1 ∨ -b^{6, 45}_0 ∨ false 
c  in DIMACS:
-9260 -9261 -9262  0

c i = 46
c  -2+1 --> -1
c    ( b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧  p_276) -> ( b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0)
c  in CNF:
c    -b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨  b^{6, 47}_2
c    -b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_1
c    -b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨  b^{6, 47}_0
c  in DIMACS:
-9263 -9264  9265 -276  9266 0
-9263 -9264  9265 -276 -9267 0
-9263 -9264  9265 -276  9268 0

c  -1+1 --> 0
c    ( b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0 ∧  p_276) -> (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧ -b^{6, 47}_0)
c  in CNF:
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_2
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_1
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_0
c  in DIMACS:
-9263  9264 -9265 -276 -9266 0
-9263  9264 -9265 -276 -9267 0
-9263  9264 -9265 -276 -9268 0

c  0+1 --> 1
c    (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧  p_276) -> (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0)
c  in CNF:
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_2
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_1
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨  b^{6, 47}_0
c  in DIMACS:
 9263  9264  9265 -276 -9266 0
 9263  9264  9265 -276 -9267 0
 9263  9264  9265 -276  9268 0

c  1+1 --> 2
c    (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0 ∧  p_276) -> (-b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0)
c  in CNF:
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_2
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨  b^{6, 47}_1
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ -p_276 ∨ -b^{6, 47}_0
c  in DIMACS:
 9263  9264 -9265 -276 -9266 0
 9263  9264 -9265 -276  9267 0
 9263  9264 -9265 -276 -9268 0

c  2+1 --> break 
c    (-b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧  p_276) -> break
c  in CNF:
c     b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 9263 -9264  9265 -276 1162 0


c  2-1 --> 1
c    (-b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧ -p_276) -> (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0)
c  in CNF:
c     b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_2
c     b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_1
c     b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨  b^{6, 47}_0
c  in DIMACS:
 9263 -9264  9265  276 -9266 0
 9263 -9264  9265  276 -9267 0
 9263 -9264  9265  276  9268 0

c  1-1 --> 0
c    (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0 ∧ -p_276) -> (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧ -b^{6, 47}_0)
c  in CNF:
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_2
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_1
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_0
c  in DIMACS:
 9263  9264 -9265  276 -9266 0
 9263  9264 -9265  276 -9267 0
 9263  9264 -9265  276 -9268 0

c  0-1 --> -1
c    (-b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧ -p_276) -> ( b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0)
c  in CNF:
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨  b^{6, 47}_2
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_1
c     b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨  b^{6, 47}_0
c  in DIMACS:
 9263  9264  9265  276  9266 0
 9263  9264  9265  276 -9267 0
 9263  9264  9265  276  9268 0

c  -1-1 --> -2
c    ( b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧  b^{6, 46}_0 ∧ -p_276) -> ( b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0)
c  in CNF:
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨  b^{6, 47}_2
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨  b^{6, 47}_1
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨  p_276 ∨ -b^{6, 47}_0
c  in DIMACS:
-9263  9264 -9265  276  9266 0
-9263  9264 -9265  276  9267 0
-9263  9264 -9265  276 -9268 0

c  -2-1 --> break 
c    ( b^{6, 46}_2 ∧  b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨  b^{6, 46}_0 ∨  p_276 ∨ break
c  in DIMACS:
-9263 -9264  9265  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 46}_2 ∧ -b^{6, 46}_1 ∧ -b^{6, 46}_0 ∧ true) 
c  in CNF:
c    -b^{6, 46}_2 ∨  b^{6, 46}_1 ∨  b^{6, 46}_0 ∨ false 
c  in DIMACS:
-9263  9264  9265  0

c  3 does not represent an automaton state.
c    -(-b^{6, 46}_2 ∧  b^{6, 46}_1 ∧  b^{6, 46}_0 ∧ true) 
c  in CNF:
c     b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ false 
c  in DIMACS:
 9263 -9264 -9265  0
c  -3 does not represent an automaton state.
c    -( b^{6, 46}_2 ∧  b^{6, 46}_1 ∧  b^{6, 46}_0 ∧ true) 
c  in CNF:
c    -b^{6, 46}_2 ∨ -b^{6, 46}_1 ∨ -b^{6, 46}_0 ∨ false 
c  in DIMACS:
-9263 -9264 -9265  0

c i = 47
c  -2+1 --> -1
c    ( b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧  p_282) -> ( b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0)
c  in CNF:
c    -b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨  b^{6, 48}_2
c    -b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_1
c    -b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨  b^{6, 48}_0
c  in DIMACS:
-9266 -9267  9268 -282  9269 0
-9266 -9267  9268 -282 -9270 0
-9266 -9267  9268 -282  9271 0

c  -1+1 --> 0
c    ( b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0 ∧  p_282) -> (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧ -b^{6, 48}_0)
c  in CNF:
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_2
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_1
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_0
c  in DIMACS:
-9266  9267 -9268 -282 -9269 0
-9266  9267 -9268 -282 -9270 0
-9266  9267 -9268 -282 -9271 0

c  0+1 --> 1
c    (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧  p_282) -> (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0)
c  in CNF:
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_2
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_1
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨  b^{6, 48}_0
c  in DIMACS:
 9266  9267  9268 -282 -9269 0
 9266  9267  9268 -282 -9270 0
 9266  9267  9268 -282  9271 0

c  1+1 --> 2
c    (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0 ∧  p_282) -> (-b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0)
c  in CNF:
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_2
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨  b^{6, 48}_1
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ -p_282 ∨ -b^{6, 48}_0
c  in DIMACS:
 9266  9267 -9268 -282 -9269 0
 9266  9267 -9268 -282  9270 0
 9266  9267 -9268 -282 -9271 0

c  2+1 --> break 
c    (-b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧  p_282) -> break
c  in CNF:
c     b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 9266 -9267  9268 -282 1162 0


c  2-1 --> 1
c    (-b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧ -p_282) -> (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0)
c  in CNF:
c     b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_2
c     b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_1
c     b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨  b^{6, 48}_0
c  in DIMACS:
 9266 -9267  9268  282 -9269 0
 9266 -9267  9268  282 -9270 0
 9266 -9267  9268  282  9271 0

c  1-1 --> 0
c    (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0 ∧ -p_282) -> (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧ -b^{6, 48}_0)
c  in CNF:
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_2
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_1
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_0
c  in DIMACS:
 9266  9267 -9268  282 -9269 0
 9266  9267 -9268  282 -9270 0
 9266  9267 -9268  282 -9271 0

c  0-1 --> -1
c    (-b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧ -p_282) -> ( b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0)
c  in CNF:
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨  b^{6, 48}_2
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_1
c     b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨  b^{6, 48}_0
c  in DIMACS:
 9266  9267  9268  282  9269 0
 9266  9267  9268  282 -9270 0
 9266  9267  9268  282  9271 0

c  -1-1 --> -2
c    ( b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧  b^{6, 47}_0 ∧ -p_282) -> ( b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0)
c  in CNF:
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨  b^{6, 48}_2
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨  b^{6, 48}_1
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨  p_282 ∨ -b^{6, 48}_0
c  in DIMACS:
-9266  9267 -9268  282  9269 0
-9266  9267 -9268  282  9270 0
-9266  9267 -9268  282 -9271 0

c  -2-1 --> break 
c    ( b^{6, 47}_2 ∧  b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨  b^{6, 47}_0 ∨  p_282 ∨ break
c  in DIMACS:
-9266 -9267  9268  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 47}_2 ∧ -b^{6, 47}_1 ∧ -b^{6, 47}_0 ∧ true) 
c  in CNF:
c    -b^{6, 47}_2 ∨  b^{6, 47}_1 ∨  b^{6, 47}_0 ∨ false 
c  in DIMACS:
-9266  9267  9268  0

c  3 does not represent an automaton state.
c    -(-b^{6, 47}_2 ∧  b^{6, 47}_1 ∧  b^{6, 47}_0 ∧ true) 
c  in CNF:
c     b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ false 
c  in DIMACS:
 9266 -9267 -9268  0
c  -3 does not represent an automaton state.
c    -( b^{6, 47}_2 ∧  b^{6, 47}_1 ∧  b^{6, 47}_0 ∧ true) 
c  in CNF:
c    -b^{6, 47}_2 ∨ -b^{6, 47}_1 ∨ -b^{6, 47}_0 ∨ false 
c  in DIMACS:
-9266 -9267 -9268  0

c i = 48
c  -2+1 --> -1
c    ( b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧  p_288) -> ( b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0)
c  in CNF:
c    -b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨  b^{6, 49}_2
c    -b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_1
c    -b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨  b^{6, 49}_0
c  in DIMACS:
-9269 -9270  9271 -288  9272 0
-9269 -9270  9271 -288 -9273 0
-9269 -9270  9271 -288  9274 0

c  -1+1 --> 0
c    ( b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0 ∧  p_288) -> (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧ -b^{6, 49}_0)
c  in CNF:
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_2
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_1
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_0
c  in DIMACS:
-9269  9270 -9271 -288 -9272 0
-9269  9270 -9271 -288 -9273 0
-9269  9270 -9271 -288 -9274 0

c  0+1 --> 1
c    (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧  p_288) -> (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0)
c  in CNF:
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_2
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_1
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨  b^{6, 49}_0
c  in DIMACS:
 9269  9270  9271 -288 -9272 0
 9269  9270  9271 -288 -9273 0
 9269  9270  9271 -288  9274 0

c  1+1 --> 2
c    (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0 ∧  p_288) -> (-b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0)
c  in CNF:
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_2
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨  b^{6, 49}_1
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ -p_288 ∨ -b^{6, 49}_0
c  in DIMACS:
 9269  9270 -9271 -288 -9272 0
 9269  9270 -9271 -288  9273 0
 9269  9270 -9271 -288 -9274 0

c  2+1 --> break 
c    (-b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧  p_288) -> break
c  in CNF:
c     b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 9269 -9270  9271 -288 1162 0


c  2-1 --> 1
c    (-b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧ -p_288) -> (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0)
c  in CNF:
c     b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_2
c     b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_1
c     b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨  b^{6, 49}_0
c  in DIMACS:
 9269 -9270  9271  288 -9272 0
 9269 -9270  9271  288 -9273 0
 9269 -9270  9271  288  9274 0

c  1-1 --> 0
c    (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0 ∧ -p_288) -> (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧ -b^{6, 49}_0)
c  in CNF:
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_2
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_1
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_0
c  in DIMACS:
 9269  9270 -9271  288 -9272 0
 9269  9270 -9271  288 -9273 0
 9269  9270 -9271  288 -9274 0

c  0-1 --> -1
c    (-b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧ -p_288) -> ( b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0)
c  in CNF:
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨  b^{6, 49}_2
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_1
c     b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨  b^{6, 49}_0
c  in DIMACS:
 9269  9270  9271  288  9272 0
 9269  9270  9271  288 -9273 0
 9269  9270  9271  288  9274 0

c  -1-1 --> -2
c    ( b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧  b^{6, 48}_0 ∧ -p_288) -> ( b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0)
c  in CNF:
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨  b^{6, 49}_2
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨  b^{6, 49}_1
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨  p_288 ∨ -b^{6, 49}_0
c  in DIMACS:
-9269  9270 -9271  288  9272 0
-9269  9270 -9271  288  9273 0
-9269  9270 -9271  288 -9274 0

c  -2-1 --> break 
c    ( b^{6, 48}_2 ∧  b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨  b^{6, 48}_0 ∨  p_288 ∨ break
c  in DIMACS:
-9269 -9270  9271  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 48}_2 ∧ -b^{6, 48}_1 ∧ -b^{6, 48}_0 ∧ true) 
c  in CNF:
c    -b^{6, 48}_2 ∨  b^{6, 48}_1 ∨  b^{6, 48}_0 ∨ false 
c  in DIMACS:
-9269  9270  9271  0

c  3 does not represent an automaton state.
c    -(-b^{6, 48}_2 ∧  b^{6, 48}_1 ∧  b^{6, 48}_0 ∧ true) 
c  in CNF:
c     b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ false 
c  in DIMACS:
 9269 -9270 -9271  0
c  -3 does not represent an automaton state.
c    -( b^{6, 48}_2 ∧  b^{6, 48}_1 ∧  b^{6, 48}_0 ∧ true) 
c  in CNF:
c    -b^{6, 48}_2 ∨ -b^{6, 48}_1 ∨ -b^{6, 48}_0 ∨ false 
c  in DIMACS:
-9269 -9270 -9271  0

c i = 49
c  -2+1 --> -1
c    ( b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧  p_294) -> ( b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0)
c  in CNF:
c    -b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨  b^{6, 50}_2
c    -b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_1
c    -b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨  b^{6, 50}_0
c  in DIMACS:
-9272 -9273  9274 -294  9275 0
-9272 -9273  9274 -294 -9276 0
-9272 -9273  9274 -294  9277 0

c  -1+1 --> 0
c    ( b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0 ∧  p_294) -> (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧ -b^{6, 50}_0)
c  in CNF:
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_2
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_1
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_0
c  in DIMACS:
-9272  9273 -9274 -294 -9275 0
-9272  9273 -9274 -294 -9276 0
-9272  9273 -9274 -294 -9277 0

c  0+1 --> 1
c    (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧  p_294) -> (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0)
c  in CNF:
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_2
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_1
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨  b^{6, 50}_0
c  in DIMACS:
 9272  9273  9274 -294 -9275 0
 9272  9273  9274 -294 -9276 0
 9272  9273  9274 -294  9277 0

c  1+1 --> 2
c    (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0 ∧  p_294) -> (-b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0)
c  in CNF:
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_2
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨  b^{6, 50}_1
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ -p_294 ∨ -b^{6, 50}_0
c  in DIMACS:
 9272  9273 -9274 -294 -9275 0
 9272  9273 -9274 -294  9276 0
 9272  9273 -9274 -294 -9277 0

c  2+1 --> break 
c    (-b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧  p_294) -> break
c  in CNF:
c     b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 9272 -9273  9274 -294 1162 0


c  2-1 --> 1
c    (-b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧ -p_294) -> (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0)
c  in CNF:
c     b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_2
c     b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_1
c     b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨  b^{6, 50}_0
c  in DIMACS:
 9272 -9273  9274  294 -9275 0
 9272 -9273  9274  294 -9276 0
 9272 -9273  9274  294  9277 0

c  1-1 --> 0
c    (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0 ∧ -p_294) -> (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧ -b^{6, 50}_0)
c  in CNF:
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_2
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_1
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_0
c  in DIMACS:
 9272  9273 -9274  294 -9275 0
 9272  9273 -9274  294 -9276 0
 9272  9273 -9274  294 -9277 0

c  0-1 --> -1
c    (-b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧ -p_294) -> ( b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0)
c  in CNF:
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨  b^{6, 50}_2
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_1
c     b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨  b^{6, 50}_0
c  in DIMACS:
 9272  9273  9274  294  9275 0
 9272  9273  9274  294 -9276 0
 9272  9273  9274  294  9277 0

c  -1-1 --> -2
c    ( b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧  b^{6, 49}_0 ∧ -p_294) -> ( b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0)
c  in CNF:
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨  b^{6, 50}_2
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨  b^{6, 50}_1
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨  p_294 ∨ -b^{6, 50}_0
c  in DIMACS:
-9272  9273 -9274  294  9275 0
-9272  9273 -9274  294  9276 0
-9272  9273 -9274  294 -9277 0

c  -2-1 --> break 
c    ( b^{6, 49}_2 ∧  b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨  b^{6, 49}_0 ∨  p_294 ∨ break
c  in DIMACS:
-9272 -9273  9274  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 49}_2 ∧ -b^{6, 49}_1 ∧ -b^{6, 49}_0 ∧ true) 
c  in CNF:
c    -b^{6, 49}_2 ∨  b^{6, 49}_1 ∨  b^{6, 49}_0 ∨ false 
c  in DIMACS:
-9272  9273  9274  0

c  3 does not represent an automaton state.
c    -(-b^{6, 49}_2 ∧  b^{6, 49}_1 ∧  b^{6, 49}_0 ∧ true) 
c  in CNF:
c     b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ false 
c  in DIMACS:
 9272 -9273 -9274  0
c  -3 does not represent an automaton state.
c    -( b^{6, 49}_2 ∧  b^{6, 49}_1 ∧  b^{6, 49}_0 ∧ true) 
c  in CNF:
c    -b^{6, 49}_2 ∨ -b^{6, 49}_1 ∨ -b^{6, 49}_0 ∨ false 
c  in DIMACS:
-9272 -9273 -9274  0

c i = 50
c  -2+1 --> -1
c    ( b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧  p_300) -> ( b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0)
c  in CNF:
c    -b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨  b^{6, 51}_2
c    -b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_1
c    -b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨  b^{6, 51}_0
c  in DIMACS:
-9275 -9276  9277 -300  9278 0
-9275 -9276  9277 -300 -9279 0
-9275 -9276  9277 -300  9280 0

c  -1+1 --> 0
c    ( b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0 ∧  p_300) -> (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧ -b^{6, 51}_0)
c  in CNF:
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_2
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_1
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_0
c  in DIMACS:
-9275  9276 -9277 -300 -9278 0
-9275  9276 -9277 -300 -9279 0
-9275  9276 -9277 -300 -9280 0

c  0+1 --> 1
c    (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧  p_300) -> (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0)
c  in CNF:
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_2
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_1
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨  b^{6, 51}_0
c  in DIMACS:
 9275  9276  9277 -300 -9278 0
 9275  9276  9277 -300 -9279 0
 9275  9276  9277 -300  9280 0

c  1+1 --> 2
c    (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0 ∧  p_300) -> (-b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0)
c  in CNF:
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_2
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨  b^{6, 51}_1
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ -p_300 ∨ -b^{6, 51}_0
c  in DIMACS:
 9275  9276 -9277 -300 -9278 0
 9275  9276 -9277 -300  9279 0
 9275  9276 -9277 -300 -9280 0

c  2+1 --> break 
c    (-b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧  p_300) -> break
c  in CNF:
c     b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 9275 -9276  9277 -300 1162 0


c  2-1 --> 1
c    (-b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧ -p_300) -> (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0)
c  in CNF:
c     b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_2
c     b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_1
c     b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨  b^{6, 51}_0
c  in DIMACS:
 9275 -9276  9277  300 -9278 0
 9275 -9276  9277  300 -9279 0
 9275 -9276  9277  300  9280 0

c  1-1 --> 0
c    (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0 ∧ -p_300) -> (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧ -b^{6, 51}_0)
c  in CNF:
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_2
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_1
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_0
c  in DIMACS:
 9275  9276 -9277  300 -9278 0
 9275  9276 -9277  300 -9279 0
 9275  9276 -9277  300 -9280 0

c  0-1 --> -1
c    (-b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧ -p_300) -> ( b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0)
c  in CNF:
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨  b^{6, 51}_2
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_1
c     b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨  b^{6, 51}_0
c  in DIMACS:
 9275  9276  9277  300  9278 0
 9275  9276  9277  300 -9279 0
 9275  9276  9277  300  9280 0

c  -1-1 --> -2
c    ( b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧  b^{6, 50}_0 ∧ -p_300) -> ( b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0)
c  in CNF:
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨  b^{6, 51}_2
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨  b^{6, 51}_1
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨  p_300 ∨ -b^{6, 51}_0
c  in DIMACS:
-9275  9276 -9277  300  9278 0
-9275  9276 -9277  300  9279 0
-9275  9276 -9277  300 -9280 0

c  -2-1 --> break 
c    ( b^{6, 50}_2 ∧  b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨  b^{6, 50}_0 ∨  p_300 ∨ break
c  in DIMACS:
-9275 -9276  9277  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 50}_2 ∧ -b^{6, 50}_1 ∧ -b^{6, 50}_0 ∧ true) 
c  in CNF:
c    -b^{6, 50}_2 ∨  b^{6, 50}_1 ∨  b^{6, 50}_0 ∨ false 
c  in DIMACS:
-9275  9276  9277  0

c  3 does not represent an automaton state.
c    -(-b^{6, 50}_2 ∧  b^{6, 50}_1 ∧  b^{6, 50}_0 ∧ true) 
c  in CNF:
c     b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ false 
c  in DIMACS:
 9275 -9276 -9277  0
c  -3 does not represent an automaton state.
c    -( b^{6, 50}_2 ∧  b^{6, 50}_1 ∧  b^{6, 50}_0 ∧ true) 
c  in CNF:
c    -b^{6, 50}_2 ∨ -b^{6, 50}_1 ∨ -b^{6, 50}_0 ∨ false 
c  in DIMACS:
-9275 -9276 -9277  0

c i = 51
c  -2+1 --> -1
c    ( b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧  p_306) -> ( b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0)
c  in CNF:
c    -b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨  b^{6, 52}_2
c    -b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_1
c    -b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨  b^{6, 52}_0
c  in DIMACS:
-9278 -9279  9280 -306  9281 0
-9278 -9279  9280 -306 -9282 0
-9278 -9279  9280 -306  9283 0

c  -1+1 --> 0
c    ( b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0 ∧  p_306) -> (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧ -b^{6, 52}_0)
c  in CNF:
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_2
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_1
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_0
c  in DIMACS:
-9278  9279 -9280 -306 -9281 0
-9278  9279 -9280 -306 -9282 0
-9278  9279 -9280 -306 -9283 0

c  0+1 --> 1
c    (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧  p_306) -> (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0)
c  in CNF:
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_2
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_1
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨  b^{6, 52}_0
c  in DIMACS:
 9278  9279  9280 -306 -9281 0
 9278  9279  9280 -306 -9282 0
 9278  9279  9280 -306  9283 0

c  1+1 --> 2
c    (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0 ∧  p_306) -> (-b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0)
c  in CNF:
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_2
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨  b^{6, 52}_1
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ -p_306 ∨ -b^{6, 52}_0
c  in DIMACS:
 9278  9279 -9280 -306 -9281 0
 9278  9279 -9280 -306  9282 0
 9278  9279 -9280 -306 -9283 0

c  2+1 --> break 
c    (-b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧  p_306) -> break
c  in CNF:
c     b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 9278 -9279  9280 -306 1162 0


c  2-1 --> 1
c    (-b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧ -p_306) -> (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0)
c  in CNF:
c     b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_2
c     b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_1
c     b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨  b^{6, 52}_0
c  in DIMACS:
 9278 -9279  9280  306 -9281 0
 9278 -9279  9280  306 -9282 0
 9278 -9279  9280  306  9283 0

c  1-1 --> 0
c    (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0 ∧ -p_306) -> (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧ -b^{6, 52}_0)
c  in CNF:
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_2
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_1
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_0
c  in DIMACS:
 9278  9279 -9280  306 -9281 0
 9278  9279 -9280  306 -9282 0
 9278  9279 -9280  306 -9283 0

c  0-1 --> -1
c    (-b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧ -p_306) -> ( b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0)
c  in CNF:
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨  b^{6, 52}_2
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_1
c     b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨  b^{6, 52}_0
c  in DIMACS:
 9278  9279  9280  306  9281 0
 9278  9279  9280  306 -9282 0
 9278  9279  9280  306  9283 0

c  -1-1 --> -2
c    ( b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧  b^{6, 51}_0 ∧ -p_306) -> ( b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0)
c  in CNF:
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨  b^{6, 52}_2
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨  b^{6, 52}_1
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨  p_306 ∨ -b^{6, 52}_0
c  in DIMACS:
-9278  9279 -9280  306  9281 0
-9278  9279 -9280  306  9282 0
-9278  9279 -9280  306 -9283 0

c  -2-1 --> break 
c    ( b^{6, 51}_2 ∧  b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨  b^{6, 51}_0 ∨  p_306 ∨ break
c  in DIMACS:
-9278 -9279  9280  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 51}_2 ∧ -b^{6, 51}_1 ∧ -b^{6, 51}_0 ∧ true) 
c  in CNF:
c    -b^{6, 51}_2 ∨  b^{6, 51}_1 ∨  b^{6, 51}_0 ∨ false 
c  in DIMACS:
-9278  9279  9280  0

c  3 does not represent an automaton state.
c    -(-b^{6, 51}_2 ∧  b^{6, 51}_1 ∧  b^{6, 51}_0 ∧ true) 
c  in CNF:
c     b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ false 
c  in DIMACS:
 9278 -9279 -9280  0
c  -3 does not represent an automaton state.
c    -( b^{6, 51}_2 ∧  b^{6, 51}_1 ∧  b^{6, 51}_0 ∧ true) 
c  in CNF:
c    -b^{6, 51}_2 ∨ -b^{6, 51}_1 ∨ -b^{6, 51}_0 ∨ false 
c  in DIMACS:
-9278 -9279 -9280  0

c i = 52
c  -2+1 --> -1
c    ( b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧  p_312) -> ( b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0)
c  in CNF:
c    -b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨  b^{6, 53}_2
c    -b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_1
c    -b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨  b^{6, 53}_0
c  in DIMACS:
-9281 -9282  9283 -312  9284 0
-9281 -9282  9283 -312 -9285 0
-9281 -9282  9283 -312  9286 0

c  -1+1 --> 0
c    ( b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0 ∧  p_312) -> (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧ -b^{6, 53}_0)
c  in CNF:
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_2
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_1
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_0
c  in DIMACS:
-9281  9282 -9283 -312 -9284 0
-9281  9282 -9283 -312 -9285 0
-9281  9282 -9283 -312 -9286 0

c  0+1 --> 1
c    (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧  p_312) -> (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0)
c  in CNF:
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_2
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_1
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨  b^{6, 53}_0
c  in DIMACS:
 9281  9282  9283 -312 -9284 0
 9281  9282  9283 -312 -9285 0
 9281  9282  9283 -312  9286 0

c  1+1 --> 2
c    (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0 ∧  p_312) -> (-b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0)
c  in CNF:
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_2
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨  b^{6, 53}_1
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ -p_312 ∨ -b^{6, 53}_0
c  in DIMACS:
 9281  9282 -9283 -312 -9284 0
 9281  9282 -9283 -312  9285 0
 9281  9282 -9283 -312 -9286 0

c  2+1 --> break 
c    (-b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧  p_312) -> break
c  in CNF:
c     b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 9281 -9282  9283 -312 1162 0


c  2-1 --> 1
c    (-b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧ -p_312) -> (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0)
c  in CNF:
c     b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_2
c     b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_1
c     b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨  b^{6, 53}_0
c  in DIMACS:
 9281 -9282  9283  312 -9284 0
 9281 -9282  9283  312 -9285 0
 9281 -9282  9283  312  9286 0

c  1-1 --> 0
c    (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0 ∧ -p_312) -> (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧ -b^{6, 53}_0)
c  in CNF:
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_2
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_1
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_0
c  in DIMACS:
 9281  9282 -9283  312 -9284 0
 9281  9282 -9283  312 -9285 0
 9281  9282 -9283  312 -9286 0

c  0-1 --> -1
c    (-b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧ -p_312) -> ( b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0)
c  in CNF:
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨  b^{6, 53}_2
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_1
c     b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨  b^{6, 53}_0
c  in DIMACS:
 9281  9282  9283  312  9284 0
 9281  9282  9283  312 -9285 0
 9281  9282  9283  312  9286 0

c  -1-1 --> -2
c    ( b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧  b^{6, 52}_0 ∧ -p_312) -> ( b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0)
c  in CNF:
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨  b^{6, 53}_2
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨  b^{6, 53}_1
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨  p_312 ∨ -b^{6, 53}_0
c  in DIMACS:
-9281  9282 -9283  312  9284 0
-9281  9282 -9283  312  9285 0
-9281  9282 -9283  312 -9286 0

c  -2-1 --> break 
c    ( b^{6, 52}_2 ∧  b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨  b^{6, 52}_0 ∨  p_312 ∨ break
c  in DIMACS:
-9281 -9282  9283  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 52}_2 ∧ -b^{6, 52}_1 ∧ -b^{6, 52}_0 ∧ true) 
c  in CNF:
c    -b^{6, 52}_2 ∨  b^{6, 52}_1 ∨  b^{6, 52}_0 ∨ false 
c  in DIMACS:
-9281  9282  9283  0

c  3 does not represent an automaton state.
c    -(-b^{6, 52}_2 ∧  b^{6, 52}_1 ∧  b^{6, 52}_0 ∧ true) 
c  in CNF:
c     b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ false 
c  in DIMACS:
 9281 -9282 -9283  0
c  -3 does not represent an automaton state.
c    -( b^{6, 52}_2 ∧  b^{6, 52}_1 ∧  b^{6, 52}_0 ∧ true) 
c  in CNF:
c    -b^{6, 52}_2 ∨ -b^{6, 52}_1 ∨ -b^{6, 52}_0 ∨ false 
c  in DIMACS:
-9281 -9282 -9283  0

c i = 53
c  -2+1 --> -1
c    ( b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧  p_318) -> ( b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0)
c  in CNF:
c    -b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨  b^{6, 54}_2
c    -b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_1
c    -b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨  b^{6, 54}_0
c  in DIMACS:
-9284 -9285  9286 -318  9287 0
-9284 -9285  9286 -318 -9288 0
-9284 -9285  9286 -318  9289 0

c  -1+1 --> 0
c    ( b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0 ∧  p_318) -> (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧ -b^{6, 54}_0)
c  in CNF:
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_2
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_1
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_0
c  in DIMACS:
-9284  9285 -9286 -318 -9287 0
-9284  9285 -9286 -318 -9288 0
-9284  9285 -9286 -318 -9289 0

c  0+1 --> 1
c    (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧  p_318) -> (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0)
c  in CNF:
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_2
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_1
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨  b^{6, 54}_0
c  in DIMACS:
 9284  9285  9286 -318 -9287 0
 9284  9285  9286 -318 -9288 0
 9284  9285  9286 -318  9289 0

c  1+1 --> 2
c    (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0 ∧  p_318) -> (-b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0)
c  in CNF:
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_2
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨  b^{6, 54}_1
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ -p_318 ∨ -b^{6, 54}_0
c  in DIMACS:
 9284  9285 -9286 -318 -9287 0
 9284  9285 -9286 -318  9288 0
 9284  9285 -9286 -318 -9289 0

c  2+1 --> break 
c    (-b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧  p_318) -> break
c  in CNF:
c     b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 9284 -9285  9286 -318 1162 0


c  2-1 --> 1
c    (-b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧ -p_318) -> (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0)
c  in CNF:
c     b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_2
c     b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_1
c     b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨  b^{6, 54}_0
c  in DIMACS:
 9284 -9285  9286  318 -9287 0
 9284 -9285  9286  318 -9288 0
 9284 -9285  9286  318  9289 0

c  1-1 --> 0
c    (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0 ∧ -p_318) -> (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧ -b^{6, 54}_0)
c  in CNF:
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_2
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_1
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_0
c  in DIMACS:
 9284  9285 -9286  318 -9287 0
 9284  9285 -9286  318 -9288 0
 9284  9285 -9286  318 -9289 0

c  0-1 --> -1
c    (-b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧ -p_318) -> ( b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0)
c  in CNF:
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨  b^{6, 54}_2
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_1
c     b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨  b^{6, 54}_0
c  in DIMACS:
 9284  9285  9286  318  9287 0
 9284  9285  9286  318 -9288 0
 9284  9285  9286  318  9289 0

c  -1-1 --> -2
c    ( b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧  b^{6, 53}_0 ∧ -p_318) -> ( b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0)
c  in CNF:
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨  b^{6, 54}_2
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨  b^{6, 54}_1
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨  p_318 ∨ -b^{6, 54}_0
c  in DIMACS:
-9284  9285 -9286  318  9287 0
-9284  9285 -9286  318  9288 0
-9284  9285 -9286  318 -9289 0

c  -2-1 --> break 
c    ( b^{6, 53}_2 ∧  b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨  b^{6, 53}_0 ∨  p_318 ∨ break
c  in DIMACS:
-9284 -9285  9286  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 53}_2 ∧ -b^{6, 53}_1 ∧ -b^{6, 53}_0 ∧ true) 
c  in CNF:
c    -b^{6, 53}_2 ∨  b^{6, 53}_1 ∨  b^{6, 53}_0 ∨ false 
c  in DIMACS:
-9284  9285  9286  0

c  3 does not represent an automaton state.
c    -(-b^{6, 53}_2 ∧  b^{6, 53}_1 ∧  b^{6, 53}_0 ∧ true) 
c  in CNF:
c     b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ false 
c  in DIMACS:
 9284 -9285 -9286  0
c  -3 does not represent an automaton state.
c    -( b^{6, 53}_2 ∧  b^{6, 53}_1 ∧  b^{6, 53}_0 ∧ true) 
c  in CNF:
c    -b^{6, 53}_2 ∨ -b^{6, 53}_1 ∨ -b^{6, 53}_0 ∨ false 
c  in DIMACS:
-9284 -9285 -9286  0

c i = 54
c  -2+1 --> -1
c    ( b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧  p_324) -> ( b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0)
c  in CNF:
c    -b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨  b^{6, 55}_2
c    -b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_1
c    -b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨  b^{6, 55}_0
c  in DIMACS:
-9287 -9288  9289 -324  9290 0
-9287 -9288  9289 -324 -9291 0
-9287 -9288  9289 -324  9292 0

c  -1+1 --> 0
c    ( b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0 ∧  p_324) -> (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧ -b^{6, 55}_0)
c  in CNF:
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_2
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_1
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_0
c  in DIMACS:
-9287  9288 -9289 -324 -9290 0
-9287  9288 -9289 -324 -9291 0
-9287  9288 -9289 -324 -9292 0

c  0+1 --> 1
c    (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧  p_324) -> (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0)
c  in CNF:
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_2
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_1
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨  b^{6, 55}_0
c  in DIMACS:
 9287  9288  9289 -324 -9290 0
 9287  9288  9289 -324 -9291 0
 9287  9288  9289 -324  9292 0

c  1+1 --> 2
c    (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0 ∧  p_324) -> (-b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0)
c  in CNF:
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_2
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨  b^{6, 55}_1
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ -p_324 ∨ -b^{6, 55}_0
c  in DIMACS:
 9287  9288 -9289 -324 -9290 0
 9287  9288 -9289 -324  9291 0
 9287  9288 -9289 -324 -9292 0

c  2+1 --> break 
c    (-b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧  p_324) -> break
c  in CNF:
c     b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 9287 -9288  9289 -324 1162 0


c  2-1 --> 1
c    (-b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧ -p_324) -> (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0)
c  in CNF:
c     b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_2
c     b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_1
c     b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨  b^{6, 55}_0
c  in DIMACS:
 9287 -9288  9289  324 -9290 0
 9287 -9288  9289  324 -9291 0
 9287 -9288  9289  324  9292 0

c  1-1 --> 0
c    (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0 ∧ -p_324) -> (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧ -b^{6, 55}_0)
c  in CNF:
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_2
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_1
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_0
c  in DIMACS:
 9287  9288 -9289  324 -9290 0
 9287  9288 -9289  324 -9291 0
 9287  9288 -9289  324 -9292 0

c  0-1 --> -1
c    (-b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧ -p_324) -> ( b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0)
c  in CNF:
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨  b^{6, 55}_2
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_1
c     b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨  b^{6, 55}_0
c  in DIMACS:
 9287  9288  9289  324  9290 0
 9287  9288  9289  324 -9291 0
 9287  9288  9289  324  9292 0

c  -1-1 --> -2
c    ( b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧  b^{6, 54}_0 ∧ -p_324) -> ( b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0)
c  in CNF:
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨  b^{6, 55}_2
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨  b^{6, 55}_1
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨  p_324 ∨ -b^{6, 55}_0
c  in DIMACS:
-9287  9288 -9289  324  9290 0
-9287  9288 -9289  324  9291 0
-9287  9288 -9289  324 -9292 0

c  -2-1 --> break 
c    ( b^{6, 54}_2 ∧  b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨  b^{6, 54}_0 ∨  p_324 ∨ break
c  in DIMACS:
-9287 -9288  9289  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 54}_2 ∧ -b^{6, 54}_1 ∧ -b^{6, 54}_0 ∧ true) 
c  in CNF:
c    -b^{6, 54}_2 ∨  b^{6, 54}_1 ∨  b^{6, 54}_0 ∨ false 
c  in DIMACS:
-9287  9288  9289  0

c  3 does not represent an automaton state.
c    -(-b^{6, 54}_2 ∧  b^{6, 54}_1 ∧  b^{6, 54}_0 ∧ true) 
c  in CNF:
c     b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ false 
c  in DIMACS:
 9287 -9288 -9289  0
c  -3 does not represent an automaton state.
c    -( b^{6, 54}_2 ∧  b^{6, 54}_1 ∧  b^{6, 54}_0 ∧ true) 
c  in CNF:
c    -b^{6, 54}_2 ∨ -b^{6, 54}_1 ∨ -b^{6, 54}_0 ∨ false 
c  in DIMACS:
-9287 -9288 -9289  0

c i = 55
c  -2+1 --> -1
c    ( b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧  p_330) -> ( b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0)
c  in CNF:
c    -b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨  b^{6, 56}_2
c    -b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_1
c    -b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨  b^{6, 56}_0
c  in DIMACS:
-9290 -9291  9292 -330  9293 0
-9290 -9291  9292 -330 -9294 0
-9290 -9291  9292 -330  9295 0

c  -1+1 --> 0
c    ( b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0 ∧  p_330) -> (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧ -b^{6, 56}_0)
c  in CNF:
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_2
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_1
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_0
c  in DIMACS:
-9290  9291 -9292 -330 -9293 0
-9290  9291 -9292 -330 -9294 0
-9290  9291 -9292 -330 -9295 0

c  0+1 --> 1
c    (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧  p_330) -> (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0)
c  in CNF:
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_2
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_1
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨  b^{6, 56}_0
c  in DIMACS:
 9290  9291  9292 -330 -9293 0
 9290  9291  9292 -330 -9294 0
 9290  9291  9292 -330  9295 0

c  1+1 --> 2
c    (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0 ∧  p_330) -> (-b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0)
c  in CNF:
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_2
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨  b^{6, 56}_1
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ -p_330 ∨ -b^{6, 56}_0
c  in DIMACS:
 9290  9291 -9292 -330 -9293 0
 9290  9291 -9292 -330  9294 0
 9290  9291 -9292 -330 -9295 0

c  2+1 --> break 
c    (-b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧  p_330) -> break
c  in CNF:
c     b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 9290 -9291  9292 -330 1162 0


c  2-1 --> 1
c    (-b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧ -p_330) -> (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0)
c  in CNF:
c     b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_2
c     b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_1
c     b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨  b^{6, 56}_0
c  in DIMACS:
 9290 -9291  9292  330 -9293 0
 9290 -9291  9292  330 -9294 0
 9290 -9291  9292  330  9295 0

c  1-1 --> 0
c    (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0 ∧ -p_330) -> (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧ -b^{6, 56}_0)
c  in CNF:
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_2
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_1
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_0
c  in DIMACS:
 9290  9291 -9292  330 -9293 0
 9290  9291 -9292  330 -9294 0
 9290  9291 -9292  330 -9295 0

c  0-1 --> -1
c    (-b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧ -p_330) -> ( b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0)
c  in CNF:
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨  b^{6, 56}_2
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_1
c     b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨  b^{6, 56}_0
c  in DIMACS:
 9290  9291  9292  330  9293 0
 9290  9291  9292  330 -9294 0
 9290  9291  9292  330  9295 0

c  -1-1 --> -2
c    ( b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧  b^{6, 55}_0 ∧ -p_330) -> ( b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0)
c  in CNF:
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨  b^{6, 56}_2
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨  b^{6, 56}_1
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨  p_330 ∨ -b^{6, 56}_0
c  in DIMACS:
-9290  9291 -9292  330  9293 0
-9290  9291 -9292  330  9294 0
-9290  9291 -9292  330 -9295 0

c  -2-1 --> break 
c    ( b^{6, 55}_2 ∧  b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨  b^{6, 55}_0 ∨  p_330 ∨ break
c  in DIMACS:
-9290 -9291  9292  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 55}_2 ∧ -b^{6, 55}_1 ∧ -b^{6, 55}_0 ∧ true) 
c  in CNF:
c    -b^{6, 55}_2 ∨  b^{6, 55}_1 ∨  b^{6, 55}_0 ∨ false 
c  in DIMACS:
-9290  9291  9292  0

c  3 does not represent an automaton state.
c    -(-b^{6, 55}_2 ∧  b^{6, 55}_1 ∧  b^{6, 55}_0 ∧ true) 
c  in CNF:
c     b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ false 
c  in DIMACS:
 9290 -9291 -9292  0
c  -3 does not represent an automaton state.
c    -( b^{6, 55}_2 ∧  b^{6, 55}_1 ∧  b^{6, 55}_0 ∧ true) 
c  in CNF:
c    -b^{6, 55}_2 ∨ -b^{6, 55}_1 ∨ -b^{6, 55}_0 ∨ false 
c  in DIMACS:
-9290 -9291 -9292  0

c i = 56
c  -2+1 --> -1
c    ( b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧  p_336) -> ( b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0)
c  in CNF:
c    -b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨  b^{6, 57}_2
c    -b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_1
c    -b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨  b^{6, 57}_0
c  in DIMACS:
-9293 -9294  9295 -336  9296 0
-9293 -9294  9295 -336 -9297 0
-9293 -9294  9295 -336  9298 0

c  -1+1 --> 0
c    ( b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0 ∧  p_336) -> (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧ -b^{6, 57}_0)
c  in CNF:
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_2
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_1
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_0
c  in DIMACS:
-9293  9294 -9295 -336 -9296 0
-9293  9294 -9295 -336 -9297 0
-9293  9294 -9295 -336 -9298 0

c  0+1 --> 1
c    (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧  p_336) -> (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0)
c  in CNF:
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_2
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_1
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨  b^{6, 57}_0
c  in DIMACS:
 9293  9294  9295 -336 -9296 0
 9293  9294  9295 -336 -9297 0
 9293  9294  9295 -336  9298 0

c  1+1 --> 2
c    (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0 ∧  p_336) -> (-b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0)
c  in CNF:
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_2
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨  b^{6, 57}_1
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ -p_336 ∨ -b^{6, 57}_0
c  in DIMACS:
 9293  9294 -9295 -336 -9296 0
 9293  9294 -9295 -336  9297 0
 9293  9294 -9295 -336 -9298 0

c  2+1 --> break 
c    (-b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧  p_336) -> break
c  in CNF:
c     b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 9293 -9294  9295 -336 1162 0


c  2-1 --> 1
c    (-b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧ -p_336) -> (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0)
c  in CNF:
c     b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_2
c     b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_1
c     b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨  b^{6, 57}_0
c  in DIMACS:
 9293 -9294  9295  336 -9296 0
 9293 -9294  9295  336 -9297 0
 9293 -9294  9295  336  9298 0

c  1-1 --> 0
c    (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0 ∧ -p_336) -> (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧ -b^{6, 57}_0)
c  in CNF:
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_2
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_1
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_0
c  in DIMACS:
 9293  9294 -9295  336 -9296 0
 9293  9294 -9295  336 -9297 0
 9293  9294 -9295  336 -9298 0

c  0-1 --> -1
c    (-b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧ -p_336) -> ( b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0)
c  in CNF:
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨  b^{6, 57}_2
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_1
c     b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨  b^{6, 57}_0
c  in DIMACS:
 9293  9294  9295  336  9296 0
 9293  9294  9295  336 -9297 0
 9293  9294  9295  336  9298 0

c  -1-1 --> -2
c    ( b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧  b^{6, 56}_0 ∧ -p_336) -> ( b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0)
c  in CNF:
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨  b^{6, 57}_2
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨  b^{6, 57}_1
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨  p_336 ∨ -b^{6, 57}_0
c  in DIMACS:
-9293  9294 -9295  336  9296 0
-9293  9294 -9295  336  9297 0
-9293  9294 -9295  336 -9298 0

c  -2-1 --> break 
c    ( b^{6, 56}_2 ∧  b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨  b^{6, 56}_0 ∨  p_336 ∨ break
c  in DIMACS:
-9293 -9294  9295  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 56}_2 ∧ -b^{6, 56}_1 ∧ -b^{6, 56}_0 ∧ true) 
c  in CNF:
c    -b^{6, 56}_2 ∨  b^{6, 56}_1 ∨  b^{6, 56}_0 ∨ false 
c  in DIMACS:
-9293  9294  9295  0

c  3 does not represent an automaton state.
c    -(-b^{6, 56}_2 ∧  b^{6, 56}_1 ∧  b^{6, 56}_0 ∧ true) 
c  in CNF:
c     b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ false 
c  in DIMACS:
 9293 -9294 -9295  0
c  -3 does not represent an automaton state.
c    -( b^{6, 56}_2 ∧  b^{6, 56}_1 ∧  b^{6, 56}_0 ∧ true) 
c  in CNF:
c    -b^{6, 56}_2 ∨ -b^{6, 56}_1 ∨ -b^{6, 56}_0 ∨ false 
c  in DIMACS:
-9293 -9294 -9295  0

c i = 57
c  -2+1 --> -1
c    ( b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧  p_342) -> ( b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0)
c  in CNF:
c    -b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨  b^{6, 58}_2
c    -b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_1
c    -b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨  b^{6, 58}_0
c  in DIMACS:
-9296 -9297  9298 -342  9299 0
-9296 -9297  9298 -342 -9300 0
-9296 -9297  9298 -342  9301 0

c  -1+1 --> 0
c    ( b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0 ∧  p_342) -> (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧ -b^{6, 58}_0)
c  in CNF:
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_2
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_1
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_0
c  in DIMACS:
-9296  9297 -9298 -342 -9299 0
-9296  9297 -9298 -342 -9300 0
-9296  9297 -9298 -342 -9301 0

c  0+1 --> 1
c    (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧  p_342) -> (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0)
c  in CNF:
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_2
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_1
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨  b^{6, 58}_0
c  in DIMACS:
 9296  9297  9298 -342 -9299 0
 9296  9297  9298 -342 -9300 0
 9296  9297  9298 -342  9301 0

c  1+1 --> 2
c    (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0 ∧  p_342) -> (-b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0)
c  in CNF:
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_2
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨  b^{6, 58}_1
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ -p_342 ∨ -b^{6, 58}_0
c  in DIMACS:
 9296  9297 -9298 -342 -9299 0
 9296  9297 -9298 -342  9300 0
 9296  9297 -9298 -342 -9301 0

c  2+1 --> break 
c    (-b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧  p_342) -> break
c  in CNF:
c     b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 9296 -9297  9298 -342 1162 0


c  2-1 --> 1
c    (-b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧ -p_342) -> (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0)
c  in CNF:
c     b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_2
c     b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_1
c     b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨  b^{6, 58}_0
c  in DIMACS:
 9296 -9297  9298  342 -9299 0
 9296 -9297  9298  342 -9300 0
 9296 -9297  9298  342  9301 0

c  1-1 --> 0
c    (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0 ∧ -p_342) -> (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧ -b^{6, 58}_0)
c  in CNF:
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_2
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_1
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_0
c  in DIMACS:
 9296  9297 -9298  342 -9299 0
 9296  9297 -9298  342 -9300 0
 9296  9297 -9298  342 -9301 0

c  0-1 --> -1
c    (-b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧ -p_342) -> ( b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0)
c  in CNF:
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨  b^{6, 58}_2
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_1
c     b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨  b^{6, 58}_0
c  in DIMACS:
 9296  9297  9298  342  9299 0
 9296  9297  9298  342 -9300 0
 9296  9297  9298  342  9301 0

c  -1-1 --> -2
c    ( b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧  b^{6, 57}_0 ∧ -p_342) -> ( b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0)
c  in CNF:
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨  b^{6, 58}_2
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨  b^{6, 58}_1
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨  p_342 ∨ -b^{6, 58}_0
c  in DIMACS:
-9296  9297 -9298  342  9299 0
-9296  9297 -9298  342  9300 0
-9296  9297 -9298  342 -9301 0

c  -2-1 --> break 
c    ( b^{6, 57}_2 ∧  b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨  b^{6, 57}_0 ∨  p_342 ∨ break
c  in DIMACS:
-9296 -9297  9298  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 57}_2 ∧ -b^{6, 57}_1 ∧ -b^{6, 57}_0 ∧ true) 
c  in CNF:
c    -b^{6, 57}_2 ∨  b^{6, 57}_1 ∨  b^{6, 57}_0 ∨ false 
c  in DIMACS:
-9296  9297  9298  0

c  3 does not represent an automaton state.
c    -(-b^{6, 57}_2 ∧  b^{6, 57}_1 ∧  b^{6, 57}_0 ∧ true) 
c  in CNF:
c     b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ false 
c  in DIMACS:
 9296 -9297 -9298  0
c  -3 does not represent an automaton state.
c    -( b^{6, 57}_2 ∧  b^{6, 57}_1 ∧  b^{6, 57}_0 ∧ true) 
c  in CNF:
c    -b^{6, 57}_2 ∨ -b^{6, 57}_1 ∨ -b^{6, 57}_0 ∨ false 
c  in DIMACS:
-9296 -9297 -9298  0

c i = 58
c  -2+1 --> -1
c    ( b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧  p_348) -> ( b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0)
c  in CNF:
c    -b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨  b^{6, 59}_2
c    -b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_1
c    -b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨  b^{6, 59}_0
c  in DIMACS:
-9299 -9300  9301 -348  9302 0
-9299 -9300  9301 -348 -9303 0
-9299 -9300  9301 -348  9304 0

c  -1+1 --> 0
c    ( b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0 ∧  p_348) -> (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧ -b^{6, 59}_0)
c  in CNF:
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_2
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_1
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_0
c  in DIMACS:
-9299  9300 -9301 -348 -9302 0
-9299  9300 -9301 -348 -9303 0
-9299  9300 -9301 -348 -9304 0

c  0+1 --> 1
c    (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧  p_348) -> (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0)
c  in CNF:
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_2
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_1
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨  b^{6, 59}_0
c  in DIMACS:
 9299  9300  9301 -348 -9302 0
 9299  9300  9301 -348 -9303 0
 9299  9300  9301 -348  9304 0

c  1+1 --> 2
c    (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0 ∧  p_348) -> (-b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0)
c  in CNF:
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_2
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨  b^{6, 59}_1
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ -p_348 ∨ -b^{6, 59}_0
c  in DIMACS:
 9299  9300 -9301 -348 -9302 0
 9299  9300 -9301 -348  9303 0
 9299  9300 -9301 -348 -9304 0

c  2+1 --> break 
c    (-b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧  p_348) -> break
c  in CNF:
c     b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 9299 -9300  9301 -348 1162 0


c  2-1 --> 1
c    (-b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧ -p_348) -> (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0)
c  in CNF:
c     b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_2
c     b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_1
c     b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨  b^{6, 59}_0
c  in DIMACS:
 9299 -9300  9301  348 -9302 0
 9299 -9300  9301  348 -9303 0
 9299 -9300  9301  348  9304 0

c  1-1 --> 0
c    (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0 ∧ -p_348) -> (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧ -b^{6, 59}_0)
c  in CNF:
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_2
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_1
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_0
c  in DIMACS:
 9299  9300 -9301  348 -9302 0
 9299  9300 -9301  348 -9303 0
 9299  9300 -9301  348 -9304 0

c  0-1 --> -1
c    (-b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧ -p_348) -> ( b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0)
c  in CNF:
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨  b^{6, 59}_2
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_1
c     b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨  b^{6, 59}_0
c  in DIMACS:
 9299  9300  9301  348  9302 0
 9299  9300  9301  348 -9303 0
 9299  9300  9301  348  9304 0

c  -1-1 --> -2
c    ( b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧  b^{6, 58}_0 ∧ -p_348) -> ( b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0)
c  in CNF:
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨  b^{6, 59}_2
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨  b^{6, 59}_1
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨  p_348 ∨ -b^{6, 59}_0
c  in DIMACS:
-9299  9300 -9301  348  9302 0
-9299  9300 -9301  348  9303 0
-9299  9300 -9301  348 -9304 0

c  -2-1 --> break 
c    ( b^{6, 58}_2 ∧  b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨  b^{6, 58}_0 ∨  p_348 ∨ break
c  in DIMACS:
-9299 -9300  9301  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 58}_2 ∧ -b^{6, 58}_1 ∧ -b^{6, 58}_0 ∧ true) 
c  in CNF:
c    -b^{6, 58}_2 ∨  b^{6, 58}_1 ∨  b^{6, 58}_0 ∨ false 
c  in DIMACS:
-9299  9300  9301  0

c  3 does not represent an automaton state.
c    -(-b^{6, 58}_2 ∧  b^{6, 58}_1 ∧  b^{6, 58}_0 ∧ true) 
c  in CNF:
c     b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ false 
c  in DIMACS:
 9299 -9300 -9301  0
c  -3 does not represent an automaton state.
c    -( b^{6, 58}_2 ∧  b^{6, 58}_1 ∧  b^{6, 58}_0 ∧ true) 
c  in CNF:
c    -b^{6, 58}_2 ∨ -b^{6, 58}_1 ∨ -b^{6, 58}_0 ∨ false 
c  in DIMACS:
-9299 -9300 -9301  0

c i = 59
c  -2+1 --> -1
c    ( b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧  p_354) -> ( b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0)
c  in CNF:
c    -b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨  b^{6, 60}_2
c    -b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_1
c    -b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨  b^{6, 60}_0
c  in DIMACS:
-9302 -9303  9304 -354  9305 0
-9302 -9303  9304 -354 -9306 0
-9302 -9303  9304 -354  9307 0

c  -1+1 --> 0
c    ( b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0 ∧  p_354) -> (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧ -b^{6, 60}_0)
c  in CNF:
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_2
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_1
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_0
c  in DIMACS:
-9302  9303 -9304 -354 -9305 0
-9302  9303 -9304 -354 -9306 0
-9302  9303 -9304 -354 -9307 0

c  0+1 --> 1
c    (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧  p_354) -> (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0)
c  in CNF:
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_2
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_1
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨  b^{6, 60}_0
c  in DIMACS:
 9302  9303  9304 -354 -9305 0
 9302  9303  9304 -354 -9306 0
 9302  9303  9304 -354  9307 0

c  1+1 --> 2
c    (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0 ∧  p_354) -> (-b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0)
c  in CNF:
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_2
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨  b^{6, 60}_1
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ -p_354 ∨ -b^{6, 60}_0
c  in DIMACS:
 9302  9303 -9304 -354 -9305 0
 9302  9303 -9304 -354  9306 0
 9302  9303 -9304 -354 -9307 0

c  2+1 --> break 
c    (-b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧  p_354) -> break
c  in CNF:
c     b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 9302 -9303  9304 -354 1162 0


c  2-1 --> 1
c    (-b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧ -p_354) -> (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0)
c  in CNF:
c     b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_2
c     b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_1
c     b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨  b^{6, 60}_0
c  in DIMACS:
 9302 -9303  9304  354 -9305 0
 9302 -9303  9304  354 -9306 0
 9302 -9303  9304  354  9307 0

c  1-1 --> 0
c    (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0 ∧ -p_354) -> (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧ -b^{6, 60}_0)
c  in CNF:
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_2
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_1
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_0
c  in DIMACS:
 9302  9303 -9304  354 -9305 0
 9302  9303 -9304  354 -9306 0
 9302  9303 -9304  354 -9307 0

c  0-1 --> -1
c    (-b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧ -p_354) -> ( b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0)
c  in CNF:
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨  b^{6, 60}_2
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_1
c     b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨  b^{6, 60}_0
c  in DIMACS:
 9302  9303  9304  354  9305 0
 9302  9303  9304  354 -9306 0
 9302  9303  9304  354  9307 0

c  -1-1 --> -2
c    ( b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧  b^{6, 59}_0 ∧ -p_354) -> ( b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0)
c  in CNF:
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨  b^{6, 60}_2
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨  b^{6, 60}_1
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨  p_354 ∨ -b^{6, 60}_0
c  in DIMACS:
-9302  9303 -9304  354  9305 0
-9302  9303 -9304  354  9306 0
-9302  9303 -9304  354 -9307 0

c  -2-1 --> break 
c    ( b^{6, 59}_2 ∧  b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨  b^{6, 59}_0 ∨  p_354 ∨ break
c  in DIMACS:
-9302 -9303  9304  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 59}_2 ∧ -b^{6, 59}_1 ∧ -b^{6, 59}_0 ∧ true) 
c  in CNF:
c    -b^{6, 59}_2 ∨  b^{6, 59}_1 ∨  b^{6, 59}_0 ∨ false 
c  in DIMACS:
-9302  9303  9304  0

c  3 does not represent an automaton state.
c    -(-b^{6, 59}_2 ∧  b^{6, 59}_1 ∧  b^{6, 59}_0 ∧ true) 
c  in CNF:
c     b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ false 
c  in DIMACS:
 9302 -9303 -9304  0
c  -3 does not represent an automaton state.
c    -( b^{6, 59}_2 ∧  b^{6, 59}_1 ∧  b^{6, 59}_0 ∧ true) 
c  in CNF:
c    -b^{6, 59}_2 ∨ -b^{6, 59}_1 ∨ -b^{6, 59}_0 ∨ false 
c  in DIMACS:
-9302 -9303 -9304  0

c i = 60
c  -2+1 --> -1
c    ( b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧  p_360) -> ( b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0)
c  in CNF:
c    -b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨  b^{6, 61}_2
c    -b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_1
c    -b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨  b^{6, 61}_0
c  in DIMACS:
-9305 -9306  9307 -360  9308 0
-9305 -9306  9307 -360 -9309 0
-9305 -9306  9307 -360  9310 0

c  -1+1 --> 0
c    ( b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0 ∧  p_360) -> (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧ -b^{6, 61}_0)
c  in CNF:
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_2
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_1
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_0
c  in DIMACS:
-9305  9306 -9307 -360 -9308 0
-9305  9306 -9307 -360 -9309 0
-9305  9306 -9307 -360 -9310 0

c  0+1 --> 1
c    (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧  p_360) -> (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0)
c  in CNF:
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_2
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_1
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨  b^{6, 61}_0
c  in DIMACS:
 9305  9306  9307 -360 -9308 0
 9305  9306  9307 -360 -9309 0
 9305  9306  9307 -360  9310 0

c  1+1 --> 2
c    (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0 ∧  p_360) -> (-b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0)
c  in CNF:
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_2
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨  b^{6, 61}_1
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ -p_360 ∨ -b^{6, 61}_0
c  in DIMACS:
 9305  9306 -9307 -360 -9308 0
 9305  9306 -9307 -360  9309 0
 9305  9306 -9307 -360 -9310 0

c  2+1 --> break 
c    (-b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧  p_360) -> break
c  in CNF:
c     b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 9305 -9306  9307 -360 1162 0


c  2-1 --> 1
c    (-b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧ -p_360) -> (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0)
c  in CNF:
c     b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_2
c     b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_1
c     b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨  b^{6, 61}_0
c  in DIMACS:
 9305 -9306  9307  360 -9308 0
 9305 -9306  9307  360 -9309 0
 9305 -9306  9307  360  9310 0

c  1-1 --> 0
c    (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0 ∧ -p_360) -> (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧ -b^{6, 61}_0)
c  in CNF:
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_2
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_1
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_0
c  in DIMACS:
 9305  9306 -9307  360 -9308 0
 9305  9306 -9307  360 -9309 0
 9305  9306 -9307  360 -9310 0

c  0-1 --> -1
c    (-b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧ -p_360) -> ( b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0)
c  in CNF:
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨  b^{6, 61}_2
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_1
c     b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨  b^{6, 61}_0
c  in DIMACS:
 9305  9306  9307  360  9308 0
 9305  9306  9307  360 -9309 0
 9305  9306  9307  360  9310 0

c  -1-1 --> -2
c    ( b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧  b^{6, 60}_0 ∧ -p_360) -> ( b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0)
c  in CNF:
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨  b^{6, 61}_2
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨  b^{6, 61}_1
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨  p_360 ∨ -b^{6, 61}_0
c  in DIMACS:
-9305  9306 -9307  360  9308 0
-9305  9306 -9307  360  9309 0
-9305  9306 -9307  360 -9310 0

c  -2-1 --> break 
c    ( b^{6, 60}_2 ∧  b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨  b^{6, 60}_0 ∨  p_360 ∨ break
c  in DIMACS:
-9305 -9306  9307  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 60}_2 ∧ -b^{6, 60}_1 ∧ -b^{6, 60}_0 ∧ true) 
c  in CNF:
c    -b^{6, 60}_2 ∨  b^{6, 60}_1 ∨  b^{6, 60}_0 ∨ false 
c  in DIMACS:
-9305  9306  9307  0

c  3 does not represent an automaton state.
c    -(-b^{6, 60}_2 ∧  b^{6, 60}_1 ∧  b^{6, 60}_0 ∧ true) 
c  in CNF:
c     b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ false 
c  in DIMACS:
 9305 -9306 -9307  0
c  -3 does not represent an automaton state.
c    -( b^{6, 60}_2 ∧  b^{6, 60}_1 ∧  b^{6, 60}_0 ∧ true) 
c  in CNF:
c    -b^{6, 60}_2 ∨ -b^{6, 60}_1 ∨ -b^{6, 60}_0 ∨ false 
c  in DIMACS:
-9305 -9306 -9307  0

c i = 61
c  -2+1 --> -1
c    ( b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧  p_366) -> ( b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0)
c  in CNF:
c    -b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨  b^{6, 62}_2
c    -b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_1
c    -b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨  b^{6, 62}_0
c  in DIMACS:
-9308 -9309  9310 -366  9311 0
-9308 -9309  9310 -366 -9312 0
-9308 -9309  9310 -366  9313 0

c  -1+1 --> 0
c    ( b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0 ∧  p_366) -> (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧ -b^{6, 62}_0)
c  in CNF:
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_2
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_1
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_0
c  in DIMACS:
-9308  9309 -9310 -366 -9311 0
-9308  9309 -9310 -366 -9312 0
-9308  9309 -9310 -366 -9313 0

c  0+1 --> 1
c    (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧  p_366) -> (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0)
c  in CNF:
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_2
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_1
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨  b^{6, 62}_0
c  in DIMACS:
 9308  9309  9310 -366 -9311 0
 9308  9309  9310 -366 -9312 0
 9308  9309  9310 -366  9313 0

c  1+1 --> 2
c    (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0 ∧  p_366) -> (-b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0)
c  in CNF:
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_2
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨  b^{6, 62}_1
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ -p_366 ∨ -b^{6, 62}_0
c  in DIMACS:
 9308  9309 -9310 -366 -9311 0
 9308  9309 -9310 -366  9312 0
 9308  9309 -9310 -366 -9313 0

c  2+1 --> break 
c    (-b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧  p_366) -> break
c  in CNF:
c     b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 9308 -9309  9310 -366 1162 0


c  2-1 --> 1
c    (-b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧ -p_366) -> (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0)
c  in CNF:
c     b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_2
c     b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_1
c     b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨  b^{6, 62}_0
c  in DIMACS:
 9308 -9309  9310  366 -9311 0
 9308 -9309  9310  366 -9312 0
 9308 -9309  9310  366  9313 0

c  1-1 --> 0
c    (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0 ∧ -p_366) -> (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧ -b^{6, 62}_0)
c  in CNF:
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_2
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_1
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_0
c  in DIMACS:
 9308  9309 -9310  366 -9311 0
 9308  9309 -9310  366 -9312 0
 9308  9309 -9310  366 -9313 0

c  0-1 --> -1
c    (-b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧ -p_366) -> ( b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0)
c  in CNF:
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨  b^{6, 62}_2
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_1
c     b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨  b^{6, 62}_0
c  in DIMACS:
 9308  9309  9310  366  9311 0
 9308  9309  9310  366 -9312 0
 9308  9309  9310  366  9313 0

c  -1-1 --> -2
c    ( b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧  b^{6, 61}_0 ∧ -p_366) -> ( b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0)
c  in CNF:
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨  b^{6, 62}_2
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨  b^{6, 62}_1
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨  p_366 ∨ -b^{6, 62}_0
c  in DIMACS:
-9308  9309 -9310  366  9311 0
-9308  9309 -9310  366  9312 0
-9308  9309 -9310  366 -9313 0

c  -2-1 --> break 
c    ( b^{6, 61}_2 ∧  b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨  b^{6, 61}_0 ∨  p_366 ∨ break
c  in DIMACS:
-9308 -9309  9310  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 61}_2 ∧ -b^{6, 61}_1 ∧ -b^{6, 61}_0 ∧ true) 
c  in CNF:
c    -b^{6, 61}_2 ∨  b^{6, 61}_1 ∨  b^{6, 61}_0 ∨ false 
c  in DIMACS:
-9308  9309  9310  0

c  3 does not represent an automaton state.
c    -(-b^{6, 61}_2 ∧  b^{6, 61}_1 ∧  b^{6, 61}_0 ∧ true) 
c  in CNF:
c     b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ false 
c  in DIMACS:
 9308 -9309 -9310  0
c  -3 does not represent an automaton state.
c    -( b^{6, 61}_2 ∧  b^{6, 61}_1 ∧  b^{6, 61}_0 ∧ true) 
c  in CNF:
c    -b^{6, 61}_2 ∨ -b^{6, 61}_1 ∨ -b^{6, 61}_0 ∨ false 
c  in DIMACS:
-9308 -9309 -9310  0

c i = 62
c  -2+1 --> -1
c    ( b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧  p_372) -> ( b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0)
c  in CNF:
c    -b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨  b^{6, 63}_2
c    -b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_1
c    -b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨  b^{6, 63}_0
c  in DIMACS:
-9311 -9312  9313 -372  9314 0
-9311 -9312  9313 -372 -9315 0
-9311 -9312  9313 -372  9316 0

c  -1+1 --> 0
c    ( b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0 ∧  p_372) -> (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧ -b^{6, 63}_0)
c  in CNF:
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_2
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_1
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_0
c  in DIMACS:
-9311  9312 -9313 -372 -9314 0
-9311  9312 -9313 -372 -9315 0
-9311  9312 -9313 -372 -9316 0

c  0+1 --> 1
c    (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧  p_372) -> (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0)
c  in CNF:
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_2
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_1
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨  b^{6, 63}_0
c  in DIMACS:
 9311  9312  9313 -372 -9314 0
 9311  9312  9313 -372 -9315 0
 9311  9312  9313 -372  9316 0

c  1+1 --> 2
c    (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0 ∧  p_372) -> (-b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0)
c  in CNF:
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_2
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨  b^{6, 63}_1
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ -p_372 ∨ -b^{6, 63}_0
c  in DIMACS:
 9311  9312 -9313 -372 -9314 0
 9311  9312 -9313 -372  9315 0
 9311  9312 -9313 -372 -9316 0

c  2+1 --> break 
c    (-b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧  p_372) -> break
c  in CNF:
c     b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 9311 -9312  9313 -372 1162 0


c  2-1 --> 1
c    (-b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧ -p_372) -> (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0)
c  in CNF:
c     b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_2
c     b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_1
c     b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨  b^{6, 63}_0
c  in DIMACS:
 9311 -9312  9313  372 -9314 0
 9311 -9312  9313  372 -9315 0
 9311 -9312  9313  372  9316 0

c  1-1 --> 0
c    (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0 ∧ -p_372) -> (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧ -b^{6, 63}_0)
c  in CNF:
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_2
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_1
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_0
c  in DIMACS:
 9311  9312 -9313  372 -9314 0
 9311  9312 -9313  372 -9315 0
 9311  9312 -9313  372 -9316 0

c  0-1 --> -1
c    (-b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧ -p_372) -> ( b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0)
c  in CNF:
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨  b^{6, 63}_2
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_1
c     b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨  b^{6, 63}_0
c  in DIMACS:
 9311  9312  9313  372  9314 0
 9311  9312  9313  372 -9315 0
 9311  9312  9313  372  9316 0

c  -1-1 --> -2
c    ( b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧  b^{6, 62}_0 ∧ -p_372) -> ( b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0)
c  in CNF:
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨  b^{6, 63}_2
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨  b^{6, 63}_1
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨  p_372 ∨ -b^{6, 63}_0
c  in DIMACS:
-9311  9312 -9313  372  9314 0
-9311  9312 -9313  372  9315 0
-9311  9312 -9313  372 -9316 0

c  -2-1 --> break 
c    ( b^{6, 62}_2 ∧  b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨  b^{6, 62}_0 ∨  p_372 ∨ break
c  in DIMACS:
-9311 -9312  9313  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 62}_2 ∧ -b^{6, 62}_1 ∧ -b^{6, 62}_0 ∧ true) 
c  in CNF:
c    -b^{6, 62}_2 ∨  b^{6, 62}_1 ∨  b^{6, 62}_0 ∨ false 
c  in DIMACS:
-9311  9312  9313  0

c  3 does not represent an automaton state.
c    -(-b^{6, 62}_2 ∧  b^{6, 62}_1 ∧  b^{6, 62}_0 ∧ true) 
c  in CNF:
c     b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ false 
c  in DIMACS:
 9311 -9312 -9313  0
c  -3 does not represent an automaton state.
c    -( b^{6, 62}_2 ∧  b^{6, 62}_1 ∧  b^{6, 62}_0 ∧ true) 
c  in CNF:
c    -b^{6, 62}_2 ∨ -b^{6, 62}_1 ∨ -b^{6, 62}_0 ∨ false 
c  in DIMACS:
-9311 -9312 -9313  0

c i = 63
c  -2+1 --> -1
c    ( b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧  p_378) -> ( b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0)
c  in CNF:
c    -b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨  b^{6, 64}_2
c    -b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_1
c    -b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨  b^{6, 64}_0
c  in DIMACS:
-9314 -9315  9316 -378  9317 0
-9314 -9315  9316 -378 -9318 0
-9314 -9315  9316 -378  9319 0

c  -1+1 --> 0
c    ( b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0 ∧  p_378) -> (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧ -b^{6, 64}_0)
c  in CNF:
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_2
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_1
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_0
c  in DIMACS:
-9314  9315 -9316 -378 -9317 0
-9314  9315 -9316 -378 -9318 0
-9314  9315 -9316 -378 -9319 0

c  0+1 --> 1
c    (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧  p_378) -> (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0)
c  in CNF:
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_2
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_1
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨  b^{6, 64}_0
c  in DIMACS:
 9314  9315  9316 -378 -9317 0
 9314  9315  9316 -378 -9318 0
 9314  9315  9316 -378  9319 0

c  1+1 --> 2
c    (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0 ∧  p_378) -> (-b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0)
c  in CNF:
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_2
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨  b^{6, 64}_1
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ -p_378 ∨ -b^{6, 64}_0
c  in DIMACS:
 9314  9315 -9316 -378 -9317 0
 9314  9315 -9316 -378  9318 0
 9314  9315 -9316 -378 -9319 0

c  2+1 --> break 
c    (-b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧  p_378) -> break
c  in CNF:
c     b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 9314 -9315  9316 -378 1162 0


c  2-1 --> 1
c    (-b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧ -p_378) -> (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0)
c  in CNF:
c     b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_2
c     b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_1
c     b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨  b^{6, 64}_0
c  in DIMACS:
 9314 -9315  9316  378 -9317 0
 9314 -9315  9316  378 -9318 0
 9314 -9315  9316  378  9319 0

c  1-1 --> 0
c    (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0 ∧ -p_378) -> (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧ -b^{6, 64}_0)
c  in CNF:
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_2
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_1
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_0
c  in DIMACS:
 9314  9315 -9316  378 -9317 0
 9314  9315 -9316  378 -9318 0
 9314  9315 -9316  378 -9319 0

c  0-1 --> -1
c    (-b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧ -p_378) -> ( b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0)
c  in CNF:
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨  b^{6, 64}_2
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_1
c     b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨  b^{6, 64}_0
c  in DIMACS:
 9314  9315  9316  378  9317 0
 9314  9315  9316  378 -9318 0
 9314  9315  9316  378  9319 0

c  -1-1 --> -2
c    ( b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧  b^{6, 63}_0 ∧ -p_378) -> ( b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0)
c  in CNF:
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨  b^{6, 64}_2
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨  b^{6, 64}_1
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨  p_378 ∨ -b^{6, 64}_0
c  in DIMACS:
-9314  9315 -9316  378  9317 0
-9314  9315 -9316  378  9318 0
-9314  9315 -9316  378 -9319 0

c  -2-1 --> break 
c    ( b^{6, 63}_2 ∧  b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨  b^{6, 63}_0 ∨  p_378 ∨ break
c  in DIMACS:
-9314 -9315  9316  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 63}_2 ∧ -b^{6, 63}_1 ∧ -b^{6, 63}_0 ∧ true) 
c  in CNF:
c    -b^{6, 63}_2 ∨  b^{6, 63}_1 ∨  b^{6, 63}_0 ∨ false 
c  in DIMACS:
-9314  9315  9316  0

c  3 does not represent an automaton state.
c    -(-b^{6, 63}_2 ∧  b^{6, 63}_1 ∧  b^{6, 63}_0 ∧ true) 
c  in CNF:
c     b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ false 
c  in DIMACS:
 9314 -9315 -9316  0
c  -3 does not represent an automaton state.
c    -( b^{6, 63}_2 ∧  b^{6, 63}_1 ∧  b^{6, 63}_0 ∧ true) 
c  in CNF:
c    -b^{6, 63}_2 ∨ -b^{6, 63}_1 ∨ -b^{6, 63}_0 ∨ false 
c  in DIMACS:
-9314 -9315 -9316  0

c i = 64
c  -2+1 --> -1
c    ( b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧  p_384) -> ( b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0)
c  in CNF:
c    -b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨  b^{6, 65}_2
c    -b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_1
c    -b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨  b^{6, 65}_0
c  in DIMACS:
-9317 -9318  9319 -384  9320 0
-9317 -9318  9319 -384 -9321 0
-9317 -9318  9319 -384  9322 0

c  -1+1 --> 0
c    ( b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0 ∧  p_384) -> (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧ -b^{6, 65}_0)
c  in CNF:
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_2
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_1
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_0
c  in DIMACS:
-9317  9318 -9319 -384 -9320 0
-9317  9318 -9319 -384 -9321 0
-9317  9318 -9319 -384 -9322 0

c  0+1 --> 1
c    (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧  p_384) -> (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0)
c  in CNF:
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_2
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_1
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨  b^{6, 65}_0
c  in DIMACS:
 9317  9318  9319 -384 -9320 0
 9317  9318  9319 -384 -9321 0
 9317  9318  9319 -384  9322 0

c  1+1 --> 2
c    (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0 ∧  p_384) -> (-b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0)
c  in CNF:
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_2
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨  b^{6, 65}_1
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ -p_384 ∨ -b^{6, 65}_0
c  in DIMACS:
 9317  9318 -9319 -384 -9320 0
 9317  9318 -9319 -384  9321 0
 9317  9318 -9319 -384 -9322 0

c  2+1 --> break 
c    (-b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧  p_384) -> break
c  in CNF:
c     b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 9317 -9318  9319 -384 1162 0


c  2-1 --> 1
c    (-b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧ -p_384) -> (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0)
c  in CNF:
c     b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_2
c     b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_1
c     b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨  b^{6, 65}_0
c  in DIMACS:
 9317 -9318  9319  384 -9320 0
 9317 -9318  9319  384 -9321 0
 9317 -9318  9319  384  9322 0

c  1-1 --> 0
c    (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0 ∧ -p_384) -> (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧ -b^{6, 65}_0)
c  in CNF:
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_2
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_1
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_0
c  in DIMACS:
 9317  9318 -9319  384 -9320 0
 9317  9318 -9319  384 -9321 0
 9317  9318 -9319  384 -9322 0

c  0-1 --> -1
c    (-b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧ -p_384) -> ( b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0)
c  in CNF:
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨  b^{6, 65}_2
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_1
c     b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨  b^{6, 65}_0
c  in DIMACS:
 9317  9318  9319  384  9320 0
 9317  9318  9319  384 -9321 0
 9317  9318  9319  384  9322 0

c  -1-1 --> -2
c    ( b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧  b^{6, 64}_0 ∧ -p_384) -> ( b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0)
c  in CNF:
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨  b^{6, 65}_2
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨  b^{6, 65}_1
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨  p_384 ∨ -b^{6, 65}_0
c  in DIMACS:
-9317  9318 -9319  384  9320 0
-9317  9318 -9319  384  9321 0
-9317  9318 -9319  384 -9322 0

c  -2-1 --> break 
c    ( b^{6, 64}_2 ∧  b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨  b^{6, 64}_0 ∨  p_384 ∨ break
c  in DIMACS:
-9317 -9318  9319  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 64}_2 ∧ -b^{6, 64}_1 ∧ -b^{6, 64}_0 ∧ true) 
c  in CNF:
c    -b^{6, 64}_2 ∨  b^{6, 64}_1 ∨  b^{6, 64}_0 ∨ false 
c  in DIMACS:
-9317  9318  9319  0

c  3 does not represent an automaton state.
c    -(-b^{6, 64}_2 ∧  b^{6, 64}_1 ∧  b^{6, 64}_0 ∧ true) 
c  in CNF:
c     b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ false 
c  in DIMACS:
 9317 -9318 -9319  0
c  -3 does not represent an automaton state.
c    -( b^{6, 64}_2 ∧  b^{6, 64}_1 ∧  b^{6, 64}_0 ∧ true) 
c  in CNF:
c    -b^{6, 64}_2 ∨ -b^{6, 64}_1 ∨ -b^{6, 64}_0 ∨ false 
c  in DIMACS:
-9317 -9318 -9319  0

c i = 65
c  -2+1 --> -1
c    ( b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧  p_390) -> ( b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0)
c  in CNF:
c    -b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨  b^{6, 66}_2
c    -b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_1
c    -b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨  b^{6, 66}_0
c  in DIMACS:
-9320 -9321  9322 -390  9323 0
-9320 -9321  9322 -390 -9324 0
-9320 -9321  9322 -390  9325 0

c  -1+1 --> 0
c    ( b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0 ∧  p_390) -> (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧ -b^{6, 66}_0)
c  in CNF:
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_2
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_1
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_0
c  in DIMACS:
-9320  9321 -9322 -390 -9323 0
-9320  9321 -9322 -390 -9324 0
-9320  9321 -9322 -390 -9325 0

c  0+1 --> 1
c    (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧  p_390) -> (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0)
c  in CNF:
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_2
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_1
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨  b^{6, 66}_0
c  in DIMACS:
 9320  9321  9322 -390 -9323 0
 9320  9321  9322 -390 -9324 0
 9320  9321  9322 -390  9325 0

c  1+1 --> 2
c    (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0 ∧  p_390) -> (-b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0)
c  in CNF:
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_2
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨  b^{6, 66}_1
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ -p_390 ∨ -b^{6, 66}_0
c  in DIMACS:
 9320  9321 -9322 -390 -9323 0
 9320  9321 -9322 -390  9324 0
 9320  9321 -9322 -390 -9325 0

c  2+1 --> break 
c    (-b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧  p_390) -> break
c  in CNF:
c     b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 9320 -9321  9322 -390 1162 0


c  2-1 --> 1
c    (-b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧ -p_390) -> (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0)
c  in CNF:
c     b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_2
c     b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_1
c     b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨  b^{6, 66}_0
c  in DIMACS:
 9320 -9321  9322  390 -9323 0
 9320 -9321  9322  390 -9324 0
 9320 -9321  9322  390  9325 0

c  1-1 --> 0
c    (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0 ∧ -p_390) -> (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧ -b^{6, 66}_0)
c  in CNF:
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_2
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_1
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_0
c  in DIMACS:
 9320  9321 -9322  390 -9323 0
 9320  9321 -9322  390 -9324 0
 9320  9321 -9322  390 -9325 0

c  0-1 --> -1
c    (-b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧ -p_390) -> ( b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0)
c  in CNF:
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨  b^{6, 66}_2
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_1
c     b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨  b^{6, 66}_0
c  in DIMACS:
 9320  9321  9322  390  9323 0
 9320  9321  9322  390 -9324 0
 9320  9321  9322  390  9325 0

c  -1-1 --> -2
c    ( b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧  b^{6, 65}_0 ∧ -p_390) -> ( b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0)
c  in CNF:
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨  b^{6, 66}_2
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨  b^{6, 66}_1
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨  p_390 ∨ -b^{6, 66}_0
c  in DIMACS:
-9320  9321 -9322  390  9323 0
-9320  9321 -9322  390  9324 0
-9320  9321 -9322  390 -9325 0

c  -2-1 --> break 
c    ( b^{6, 65}_2 ∧  b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨  b^{6, 65}_0 ∨  p_390 ∨ break
c  in DIMACS:
-9320 -9321  9322  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 65}_2 ∧ -b^{6, 65}_1 ∧ -b^{6, 65}_0 ∧ true) 
c  in CNF:
c    -b^{6, 65}_2 ∨  b^{6, 65}_1 ∨  b^{6, 65}_0 ∨ false 
c  in DIMACS:
-9320  9321  9322  0

c  3 does not represent an automaton state.
c    -(-b^{6, 65}_2 ∧  b^{6, 65}_1 ∧  b^{6, 65}_0 ∧ true) 
c  in CNF:
c     b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ false 
c  in DIMACS:
 9320 -9321 -9322  0
c  -3 does not represent an automaton state.
c    -( b^{6, 65}_2 ∧  b^{6, 65}_1 ∧  b^{6, 65}_0 ∧ true) 
c  in CNF:
c    -b^{6, 65}_2 ∨ -b^{6, 65}_1 ∨ -b^{6, 65}_0 ∨ false 
c  in DIMACS:
-9320 -9321 -9322  0

c i = 66
c  -2+1 --> -1
c    ( b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧  p_396) -> ( b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0)
c  in CNF:
c    -b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨  b^{6, 67}_2
c    -b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_1
c    -b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨  b^{6, 67}_0
c  in DIMACS:
-9323 -9324  9325 -396  9326 0
-9323 -9324  9325 -396 -9327 0
-9323 -9324  9325 -396  9328 0

c  -1+1 --> 0
c    ( b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0 ∧  p_396) -> (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧ -b^{6, 67}_0)
c  in CNF:
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_2
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_1
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_0
c  in DIMACS:
-9323  9324 -9325 -396 -9326 0
-9323  9324 -9325 -396 -9327 0
-9323  9324 -9325 -396 -9328 0

c  0+1 --> 1
c    (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧  p_396) -> (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0)
c  in CNF:
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_2
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_1
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨  b^{6, 67}_0
c  in DIMACS:
 9323  9324  9325 -396 -9326 0
 9323  9324  9325 -396 -9327 0
 9323  9324  9325 -396  9328 0

c  1+1 --> 2
c    (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0 ∧  p_396) -> (-b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0)
c  in CNF:
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_2
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨  b^{6, 67}_1
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ -p_396 ∨ -b^{6, 67}_0
c  in DIMACS:
 9323  9324 -9325 -396 -9326 0
 9323  9324 -9325 -396  9327 0
 9323  9324 -9325 -396 -9328 0

c  2+1 --> break 
c    (-b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧  p_396) -> break
c  in CNF:
c     b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 9323 -9324  9325 -396 1162 0


c  2-1 --> 1
c    (-b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧ -p_396) -> (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0)
c  in CNF:
c     b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_2
c     b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_1
c     b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨  b^{6, 67}_0
c  in DIMACS:
 9323 -9324  9325  396 -9326 0
 9323 -9324  9325  396 -9327 0
 9323 -9324  9325  396  9328 0

c  1-1 --> 0
c    (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0 ∧ -p_396) -> (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧ -b^{6, 67}_0)
c  in CNF:
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_2
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_1
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_0
c  in DIMACS:
 9323  9324 -9325  396 -9326 0
 9323  9324 -9325  396 -9327 0
 9323  9324 -9325  396 -9328 0

c  0-1 --> -1
c    (-b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧ -p_396) -> ( b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0)
c  in CNF:
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨  b^{6, 67}_2
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_1
c     b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨  b^{6, 67}_0
c  in DIMACS:
 9323  9324  9325  396  9326 0
 9323  9324  9325  396 -9327 0
 9323  9324  9325  396  9328 0

c  -1-1 --> -2
c    ( b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧  b^{6, 66}_0 ∧ -p_396) -> ( b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0)
c  in CNF:
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨  b^{6, 67}_2
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨  b^{6, 67}_1
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨  p_396 ∨ -b^{6, 67}_0
c  in DIMACS:
-9323  9324 -9325  396  9326 0
-9323  9324 -9325  396  9327 0
-9323  9324 -9325  396 -9328 0

c  -2-1 --> break 
c    ( b^{6, 66}_2 ∧  b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨  b^{6, 66}_0 ∨  p_396 ∨ break
c  in DIMACS:
-9323 -9324  9325  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 66}_2 ∧ -b^{6, 66}_1 ∧ -b^{6, 66}_0 ∧ true) 
c  in CNF:
c    -b^{6, 66}_2 ∨  b^{6, 66}_1 ∨  b^{6, 66}_0 ∨ false 
c  in DIMACS:
-9323  9324  9325  0

c  3 does not represent an automaton state.
c    -(-b^{6, 66}_2 ∧  b^{6, 66}_1 ∧  b^{6, 66}_0 ∧ true) 
c  in CNF:
c     b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ false 
c  in DIMACS:
 9323 -9324 -9325  0
c  -3 does not represent an automaton state.
c    -( b^{6, 66}_2 ∧  b^{6, 66}_1 ∧  b^{6, 66}_0 ∧ true) 
c  in CNF:
c    -b^{6, 66}_2 ∨ -b^{6, 66}_1 ∨ -b^{6, 66}_0 ∨ false 
c  in DIMACS:
-9323 -9324 -9325  0

c i = 67
c  -2+1 --> -1
c    ( b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧  p_402) -> ( b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0)
c  in CNF:
c    -b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨  b^{6, 68}_2
c    -b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_1
c    -b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨  b^{6, 68}_0
c  in DIMACS:
-9326 -9327  9328 -402  9329 0
-9326 -9327  9328 -402 -9330 0
-9326 -9327  9328 -402  9331 0

c  -1+1 --> 0
c    ( b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0 ∧  p_402) -> (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧ -b^{6, 68}_0)
c  in CNF:
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_2
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_1
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_0
c  in DIMACS:
-9326  9327 -9328 -402 -9329 0
-9326  9327 -9328 -402 -9330 0
-9326  9327 -9328 -402 -9331 0

c  0+1 --> 1
c    (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧  p_402) -> (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0)
c  in CNF:
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_2
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_1
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨  b^{6, 68}_0
c  in DIMACS:
 9326  9327  9328 -402 -9329 0
 9326  9327  9328 -402 -9330 0
 9326  9327  9328 -402  9331 0

c  1+1 --> 2
c    (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0 ∧  p_402) -> (-b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0)
c  in CNF:
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_2
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨  b^{6, 68}_1
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ -p_402 ∨ -b^{6, 68}_0
c  in DIMACS:
 9326  9327 -9328 -402 -9329 0
 9326  9327 -9328 -402  9330 0
 9326  9327 -9328 -402 -9331 0

c  2+1 --> break 
c    (-b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧  p_402) -> break
c  in CNF:
c     b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 9326 -9327  9328 -402 1162 0


c  2-1 --> 1
c    (-b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧ -p_402) -> (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0)
c  in CNF:
c     b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_2
c     b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_1
c     b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨  b^{6, 68}_0
c  in DIMACS:
 9326 -9327  9328  402 -9329 0
 9326 -9327  9328  402 -9330 0
 9326 -9327  9328  402  9331 0

c  1-1 --> 0
c    (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0 ∧ -p_402) -> (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧ -b^{6, 68}_0)
c  in CNF:
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_2
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_1
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_0
c  in DIMACS:
 9326  9327 -9328  402 -9329 0
 9326  9327 -9328  402 -9330 0
 9326  9327 -9328  402 -9331 0

c  0-1 --> -1
c    (-b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧ -p_402) -> ( b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0)
c  in CNF:
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨  b^{6, 68}_2
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_1
c     b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨  b^{6, 68}_0
c  in DIMACS:
 9326  9327  9328  402  9329 0
 9326  9327  9328  402 -9330 0
 9326  9327  9328  402  9331 0

c  -1-1 --> -2
c    ( b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧  b^{6, 67}_0 ∧ -p_402) -> ( b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0)
c  in CNF:
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨  b^{6, 68}_2
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨  b^{6, 68}_1
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨  p_402 ∨ -b^{6, 68}_0
c  in DIMACS:
-9326  9327 -9328  402  9329 0
-9326  9327 -9328  402  9330 0
-9326  9327 -9328  402 -9331 0

c  -2-1 --> break 
c    ( b^{6, 67}_2 ∧  b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨  b^{6, 67}_0 ∨  p_402 ∨ break
c  in DIMACS:
-9326 -9327  9328  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 67}_2 ∧ -b^{6, 67}_1 ∧ -b^{6, 67}_0 ∧ true) 
c  in CNF:
c    -b^{6, 67}_2 ∨  b^{6, 67}_1 ∨  b^{6, 67}_0 ∨ false 
c  in DIMACS:
-9326  9327  9328  0

c  3 does not represent an automaton state.
c    -(-b^{6, 67}_2 ∧  b^{6, 67}_1 ∧  b^{6, 67}_0 ∧ true) 
c  in CNF:
c     b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ false 
c  in DIMACS:
 9326 -9327 -9328  0
c  -3 does not represent an automaton state.
c    -( b^{6, 67}_2 ∧  b^{6, 67}_1 ∧  b^{6, 67}_0 ∧ true) 
c  in CNF:
c    -b^{6, 67}_2 ∨ -b^{6, 67}_1 ∨ -b^{6, 67}_0 ∨ false 
c  in DIMACS:
-9326 -9327 -9328  0

c i = 68
c  -2+1 --> -1
c    ( b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧  p_408) -> ( b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0)
c  in CNF:
c    -b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨  b^{6, 69}_2
c    -b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_1
c    -b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨  b^{6, 69}_0
c  in DIMACS:
-9329 -9330  9331 -408  9332 0
-9329 -9330  9331 -408 -9333 0
-9329 -9330  9331 -408  9334 0

c  -1+1 --> 0
c    ( b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0 ∧  p_408) -> (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧ -b^{6, 69}_0)
c  in CNF:
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_2
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_1
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_0
c  in DIMACS:
-9329  9330 -9331 -408 -9332 0
-9329  9330 -9331 -408 -9333 0
-9329  9330 -9331 -408 -9334 0

c  0+1 --> 1
c    (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧  p_408) -> (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0)
c  in CNF:
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_2
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_1
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨  b^{6, 69}_0
c  in DIMACS:
 9329  9330  9331 -408 -9332 0
 9329  9330  9331 -408 -9333 0
 9329  9330  9331 -408  9334 0

c  1+1 --> 2
c    (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0 ∧  p_408) -> (-b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0)
c  in CNF:
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_2
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨  b^{6, 69}_1
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ -p_408 ∨ -b^{6, 69}_0
c  in DIMACS:
 9329  9330 -9331 -408 -9332 0
 9329  9330 -9331 -408  9333 0
 9329  9330 -9331 -408 -9334 0

c  2+1 --> break 
c    (-b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧  p_408) -> break
c  in CNF:
c     b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 9329 -9330  9331 -408 1162 0


c  2-1 --> 1
c    (-b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧ -p_408) -> (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0)
c  in CNF:
c     b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_2
c     b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_1
c     b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨  b^{6, 69}_0
c  in DIMACS:
 9329 -9330  9331  408 -9332 0
 9329 -9330  9331  408 -9333 0
 9329 -9330  9331  408  9334 0

c  1-1 --> 0
c    (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0 ∧ -p_408) -> (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧ -b^{6, 69}_0)
c  in CNF:
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_2
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_1
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_0
c  in DIMACS:
 9329  9330 -9331  408 -9332 0
 9329  9330 -9331  408 -9333 0
 9329  9330 -9331  408 -9334 0

c  0-1 --> -1
c    (-b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧ -p_408) -> ( b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0)
c  in CNF:
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨  b^{6, 69}_2
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_1
c     b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨  b^{6, 69}_0
c  in DIMACS:
 9329  9330  9331  408  9332 0
 9329  9330  9331  408 -9333 0
 9329  9330  9331  408  9334 0

c  -1-1 --> -2
c    ( b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧  b^{6, 68}_0 ∧ -p_408) -> ( b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0)
c  in CNF:
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨  b^{6, 69}_2
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨  b^{6, 69}_1
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨  p_408 ∨ -b^{6, 69}_0
c  in DIMACS:
-9329  9330 -9331  408  9332 0
-9329  9330 -9331  408  9333 0
-9329  9330 -9331  408 -9334 0

c  -2-1 --> break 
c    ( b^{6, 68}_2 ∧  b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨  b^{6, 68}_0 ∨  p_408 ∨ break
c  in DIMACS:
-9329 -9330  9331  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 68}_2 ∧ -b^{6, 68}_1 ∧ -b^{6, 68}_0 ∧ true) 
c  in CNF:
c    -b^{6, 68}_2 ∨  b^{6, 68}_1 ∨  b^{6, 68}_0 ∨ false 
c  in DIMACS:
-9329  9330  9331  0

c  3 does not represent an automaton state.
c    -(-b^{6, 68}_2 ∧  b^{6, 68}_1 ∧  b^{6, 68}_0 ∧ true) 
c  in CNF:
c     b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ false 
c  in DIMACS:
 9329 -9330 -9331  0
c  -3 does not represent an automaton state.
c    -( b^{6, 68}_2 ∧  b^{6, 68}_1 ∧  b^{6, 68}_0 ∧ true) 
c  in CNF:
c    -b^{6, 68}_2 ∨ -b^{6, 68}_1 ∨ -b^{6, 68}_0 ∨ false 
c  in DIMACS:
-9329 -9330 -9331  0

c i = 69
c  -2+1 --> -1
c    ( b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧  p_414) -> ( b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0)
c  in CNF:
c    -b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨  b^{6, 70}_2
c    -b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_1
c    -b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨  b^{6, 70}_0
c  in DIMACS:
-9332 -9333  9334 -414  9335 0
-9332 -9333  9334 -414 -9336 0
-9332 -9333  9334 -414  9337 0

c  -1+1 --> 0
c    ( b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0 ∧  p_414) -> (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧ -b^{6, 70}_0)
c  in CNF:
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_2
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_1
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_0
c  in DIMACS:
-9332  9333 -9334 -414 -9335 0
-9332  9333 -9334 -414 -9336 0
-9332  9333 -9334 -414 -9337 0

c  0+1 --> 1
c    (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧  p_414) -> (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0)
c  in CNF:
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_2
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_1
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨  b^{6, 70}_0
c  in DIMACS:
 9332  9333  9334 -414 -9335 0
 9332  9333  9334 -414 -9336 0
 9332  9333  9334 -414  9337 0

c  1+1 --> 2
c    (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0 ∧  p_414) -> (-b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0)
c  in CNF:
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_2
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨  b^{6, 70}_1
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ -p_414 ∨ -b^{6, 70}_0
c  in DIMACS:
 9332  9333 -9334 -414 -9335 0
 9332  9333 -9334 -414  9336 0
 9332  9333 -9334 -414 -9337 0

c  2+1 --> break 
c    (-b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧  p_414) -> break
c  in CNF:
c     b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 9332 -9333  9334 -414 1162 0


c  2-1 --> 1
c    (-b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧ -p_414) -> (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0)
c  in CNF:
c     b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_2
c     b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_1
c     b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨  b^{6, 70}_0
c  in DIMACS:
 9332 -9333  9334  414 -9335 0
 9332 -9333  9334  414 -9336 0
 9332 -9333  9334  414  9337 0

c  1-1 --> 0
c    (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0 ∧ -p_414) -> (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧ -b^{6, 70}_0)
c  in CNF:
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_2
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_1
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_0
c  in DIMACS:
 9332  9333 -9334  414 -9335 0
 9332  9333 -9334  414 -9336 0
 9332  9333 -9334  414 -9337 0

c  0-1 --> -1
c    (-b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧ -p_414) -> ( b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0)
c  in CNF:
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨  b^{6, 70}_2
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_1
c     b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨  b^{6, 70}_0
c  in DIMACS:
 9332  9333  9334  414  9335 0
 9332  9333  9334  414 -9336 0
 9332  9333  9334  414  9337 0

c  -1-1 --> -2
c    ( b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧  b^{6, 69}_0 ∧ -p_414) -> ( b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0)
c  in CNF:
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨  b^{6, 70}_2
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨  b^{6, 70}_1
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨  p_414 ∨ -b^{6, 70}_0
c  in DIMACS:
-9332  9333 -9334  414  9335 0
-9332  9333 -9334  414  9336 0
-9332  9333 -9334  414 -9337 0

c  -2-1 --> break 
c    ( b^{6, 69}_2 ∧  b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨  b^{6, 69}_0 ∨  p_414 ∨ break
c  in DIMACS:
-9332 -9333  9334  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 69}_2 ∧ -b^{6, 69}_1 ∧ -b^{6, 69}_0 ∧ true) 
c  in CNF:
c    -b^{6, 69}_2 ∨  b^{6, 69}_1 ∨  b^{6, 69}_0 ∨ false 
c  in DIMACS:
-9332  9333  9334  0

c  3 does not represent an automaton state.
c    -(-b^{6, 69}_2 ∧  b^{6, 69}_1 ∧  b^{6, 69}_0 ∧ true) 
c  in CNF:
c     b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ false 
c  in DIMACS:
 9332 -9333 -9334  0
c  -3 does not represent an automaton state.
c    -( b^{6, 69}_2 ∧  b^{6, 69}_1 ∧  b^{6, 69}_0 ∧ true) 
c  in CNF:
c    -b^{6, 69}_2 ∨ -b^{6, 69}_1 ∨ -b^{6, 69}_0 ∨ false 
c  in DIMACS:
-9332 -9333 -9334  0

c i = 70
c  -2+1 --> -1
c    ( b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧  p_420) -> ( b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0)
c  in CNF:
c    -b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨  b^{6, 71}_2
c    -b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_1
c    -b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨  b^{6, 71}_0
c  in DIMACS:
-9335 -9336  9337 -420  9338 0
-9335 -9336  9337 -420 -9339 0
-9335 -9336  9337 -420  9340 0

c  -1+1 --> 0
c    ( b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0 ∧  p_420) -> (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧ -b^{6, 71}_0)
c  in CNF:
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_2
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_1
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_0
c  in DIMACS:
-9335  9336 -9337 -420 -9338 0
-9335  9336 -9337 -420 -9339 0
-9335  9336 -9337 -420 -9340 0

c  0+1 --> 1
c    (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧  p_420) -> (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0)
c  in CNF:
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_2
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_1
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨  b^{6, 71}_0
c  in DIMACS:
 9335  9336  9337 -420 -9338 0
 9335  9336  9337 -420 -9339 0
 9335  9336  9337 -420  9340 0

c  1+1 --> 2
c    (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0 ∧  p_420) -> (-b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0)
c  in CNF:
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_2
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨  b^{6, 71}_1
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ -p_420 ∨ -b^{6, 71}_0
c  in DIMACS:
 9335  9336 -9337 -420 -9338 0
 9335  9336 -9337 -420  9339 0
 9335  9336 -9337 -420 -9340 0

c  2+1 --> break 
c    (-b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧  p_420) -> break
c  in CNF:
c     b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 9335 -9336  9337 -420 1162 0


c  2-1 --> 1
c    (-b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧ -p_420) -> (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0)
c  in CNF:
c     b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_2
c     b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_1
c     b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨  b^{6, 71}_0
c  in DIMACS:
 9335 -9336  9337  420 -9338 0
 9335 -9336  9337  420 -9339 0
 9335 -9336  9337  420  9340 0

c  1-1 --> 0
c    (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0 ∧ -p_420) -> (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧ -b^{6, 71}_0)
c  in CNF:
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_2
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_1
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_0
c  in DIMACS:
 9335  9336 -9337  420 -9338 0
 9335  9336 -9337  420 -9339 0
 9335  9336 -9337  420 -9340 0

c  0-1 --> -1
c    (-b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧ -p_420) -> ( b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0)
c  in CNF:
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨  b^{6, 71}_2
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_1
c     b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨  b^{6, 71}_0
c  in DIMACS:
 9335  9336  9337  420  9338 0
 9335  9336  9337  420 -9339 0
 9335  9336  9337  420  9340 0

c  -1-1 --> -2
c    ( b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧  b^{6, 70}_0 ∧ -p_420) -> ( b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0)
c  in CNF:
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨  b^{6, 71}_2
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨  b^{6, 71}_1
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨  p_420 ∨ -b^{6, 71}_0
c  in DIMACS:
-9335  9336 -9337  420  9338 0
-9335  9336 -9337  420  9339 0
-9335  9336 -9337  420 -9340 0

c  -2-1 --> break 
c    ( b^{6, 70}_2 ∧  b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨  b^{6, 70}_0 ∨  p_420 ∨ break
c  in DIMACS:
-9335 -9336  9337  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 70}_2 ∧ -b^{6, 70}_1 ∧ -b^{6, 70}_0 ∧ true) 
c  in CNF:
c    -b^{6, 70}_2 ∨  b^{6, 70}_1 ∨  b^{6, 70}_0 ∨ false 
c  in DIMACS:
-9335  9336  9337  0

c  3 does not represent an automaton state.
c    -(-b^{6, 70}_2 ∧  b^{6, 70}_1 ∧  b^{6, 70}_0 ∧ true) 
c  in CNF:
c     b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ false 
c  in DIMACS:
 9335 -9336 -9337  0
c  -3 does not represent an automaton state.
c    -( b^{6, 70}_2 ∧  b^{6, 70}_1 ∧  b^{6, 70}_0 ∧ true) 
c  in CNF:
c    -b^{6, 70}_2 ∨ -b^{6, 70}_1 ∨ -b^{6, 70}_0 ∨ false 
c  in DIMACS:
-9335 -9336 -9337  0

c i = 71
c  -2+1 --> -1
c    ( b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧  p_426) -> ( b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0)
c  in CNF:
c    -b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨  b^{6, 72}_2
c    -b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_1
c    -b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨  b^{6, 72}_0
c  in DIMACS:
-9338 -9339  9340 -426  9341 0
-9338 -9339  9340 -426 -9342 0
-9338 -9339  9340 -426  9343 0

c  -1+1 --> 0
c    ( b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0 ∧  p_426) -> (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧ -b^{6, 72}_0)
c  in CNF:
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_2
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_1
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_0
c  in DIMACS:
-9338  9339 -9340 -426 -9341 0
-9338  9339 -9340 -426 -9342 0
-9338  9339 -9340 -426 -9343 0

c  0+1 --> 1
c    (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧  p_426) -> (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0)
c  in CNF:
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_2
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_1
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨  b^{6, 72}_0
c  in DIMACS:
 9338  9339  9340 -426 -9341 0
 9338  9339  9340 -426 -9342 0
 9338  9339  9340 -426  9343 0

c  1+1 --> 2
c    (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0 ∧  p_426) -> (-b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0)
c  in CNF:
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_2
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨  b^{6, 72}_1
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ -p_426 ∨ -b^{6, 72}_0
c  in DIMACS:
 9338  9339 -9340 -426 -9341 0
 9338  9339 -9340 -426  9342 0
 9338  9339 -9340 -426 -9343 0

c  2+1 --> break 
c    (-b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧  p_426) -> break
c  in CNF:
c     b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 9338 -9339  9340 -426 1162 0


c  2-1 --> 1
c    (-b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧ -p_426) -> (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0)
c  in CNF:
c     b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_2
c     b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_1
c     b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨  b^{6, 72}_0
c  in DIMACS:
 9338 -9339  9340  426 -9341 0
 9338 -9339  9340  426 -9342 0
 9338 -9339  9340  426  9343 0

c  1-1 --> 0
c    (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0 ∧ -p_426) -> (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧ -b^{6, 72}_0)
c  in CNF:
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_2
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_1
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_0
c  in DIMACS:
 9338  9339 -9340  426 -9341 0
 9338  9339 -9340  426 -9342 0
 9338  9339 -9340  426 -9343 0

c  0-1 --> -1
c    (-b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧ -p_426) -> ( b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0)
c  in CNF:
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨  b^{6, 72}_2
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_1
c     b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨  b^{6, 72}_0
c  in DIMACS:
 9338  9339  9340  426  9341 0
 9338  9339  9340  426 -9342 0
 9338  9339  9340  426  9343 0

c  -1-1 --> -2
c    ( b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧  b^{6, 71}_0 ∧ -p_426) -> ( b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0)
c  in CNF:
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨  b^{6, 72}_2
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨  b^{6, 72}_1
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨  p_426 ∨ -b^{6, 72}_0
c  in DIMACS:
-9338  9339 -9340  426  9341 0
-9338  9339 -9340  426  9342 0
-9338  9339 -9340  426 -9343 0

c  -2-1 --> break 
c    ( b^{6, 71}_2 ∧  b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨  b^{6, 71}_0 ∨  p_426 ∨ break
c  in DIMACS:
-9338 -9339  9340  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 71}_2 ∧ -b^{6, 71}_1 ∧ -b^{6, 71}_0 ∧ true) 
c  in CNF:
c    -b^{6, 71}_2 ∨  b^{6, 71}_1 ∨  b^{6, 71}_0 ∨ false 
c  in DIMACS:
-9338  9339  9340  0

c  3 does not represent an automaton state.
c    -(-b^{6, 71}_2 ∧  b^{6, 71}_1 ∧  b^{6, 71}_0 ∧ true) 
c  in CNF:
c     b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ false 
c  in DIMACS:
 9338 -9339 -9340  0
c  -3 does not represent an automaton state.
c    -( b^{6, 71}_2 ∧  b^{6, 71}_1 ∧  b^{6, 71}_0 ∧ true) 
c  in CNF:
c    -b^{6, 71}_2 ∨ -b^{6, 71}_1 ∨ -b^{6, 71}_0 ∨ false 
c  in DIMACS:
-9338 -9339 -9340  0

c i = 72
c  -2+1 --> -1
c    ( b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧  p_432) -> ( b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0)
c  in CNF:
c    -b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨  b^{6, 73}_2
c    -b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_1
c    -b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨  b^{6, 73}_0
c  in DIMACS:
-9341 -9342  9343 -432  9344 0
-9341 -9342  9343 -432 -9345 0
-9341 -9342  9343 -432  9346 0

c  -1+1 --> 0
c    ( b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0 ∧  p_432) -> (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧ -b^{6, 73}_0)
c  in CNF:
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_2
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_1
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_0
c  in DIMACS:
-9341  9342 -9343 -432 -9344 0
-9341  9342 -9343 -432 -9345 0
-9341  9342 -9343 -432 -9346 0

c  0+1 --> 1
c    (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧  p_432) -> (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0)
c  in CNF:
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_2
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_1
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨  b^{6, 73}_0
c  in DIMACS:
 9341  9342  9343 -432 -9344 0
 9341  9342  9343 -432 -9345 0
 9341  9342  9343 -432  9346 0

c  1+1 --> 2
c    (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0 ∧  p_432) -> (-b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0)
c  in CNF:
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_2
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨  b^{6, 73}_1
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ -p_432 ∨ -b^{6, 73}_0
c  in DIMACS:
 9341  9342 -9343 -432 -9344 0
 9341  9342 -9343 -432  9345 0
 9341  9342 -9343 -432 -9346 0

c  2+1 --> break 
c    (-b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧  p_432) -> break
c  in CNF:
c     b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 9341 -9342  9343 -432 1162 0


c  2-1 --> 1
c    (-b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧ -p_432) -> (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0)
c  in CNF:
c     b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_2
c     b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_1
c     b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨  b^{6, 73}_0
c  in DIMACS:
 9341 -9342  9343  432 -9344 0
 9341 -9342  9343  432 -9345 0
 9341 -9342  9343  432  9346 0

c  1-1 --> 0
c    (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0 ∧ -p_432) -> (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧ -b^{6, 73}_0)
c  in CNF:
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_2
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_1
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_0
c  in DIMACS:
 9341  9342 -9343  432 -9344 0
 9341  9342 -9343  432 -9345 0
 9341  9342 -9343  432 -9346 0

c  0-1 --> -1
c    (-b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧ -p_432) -> ( b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0)
c  in CNF:
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨  b^{6, 73}_2
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_1
c     b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨  b^{6, 73}_0
c  in DIMACS:
 9341  9342  9343  432  9344 0
 9341  9342  9343  432 -9345 0
 9341  9342  9343  432  9346 0

c  -1-1 --> -2
c    ( b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧  b^{6, 72}_0 ∧ -p_432) -> ( b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0)
c  in CNF:
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨  b^{6, 73}_2
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨  b^{6, 73}_1
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨  p_432 ∨ -b^{6, 73}_0
c  in DIMACS:
-9341  9342 -9343  432  9344 0
-9341  9342 -9343  432  9345 0
-9341  9342 -9343  432 -9346 0

c  -2-1 --> break 
c    ( b^{6, 72}_2 ∧  b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨  b^{6, 72}_0 ∨  p_432 ∨ break
c  in DIMACS:
-9341 -9342  9343  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 72}_2 ∧ -b^{6, 72}_1 ∧ -b^{6, 72}_0 ∧ true) 
c  in CNF:
c    -b^{6, 72}_2 ∨  b^{6, 72}_1 ∨  b^{6, 72}_0 ∨ false 
c  in DIMACS:
-9341  9342  9343  0

c  3 does not represent an automaton state.
c    -(-b^{6, 72}_2 ∧  b^{6, 72}_1 ∧  b^{6, 72}_0 ∧ true) 
c  in CNF:
c     b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ false 
c  in DIMACS:
 9341 -9342 -9343  0
c  -3 does not represent an automaton state.
c    -( b^{6, 72}_2 ∧  b^{6, 72}_1 ∧  b^{6, 72}_0 ∧ true) 
c  in CNF:
c    -b^{6, 72}_2 ∨ -b^{6, 72}_1 ∨ -b^{6, 72}_0 ∨ false 
c  in DIMACS:
-9341 -9342 -9343  0

c i = 73
c  -2+1 --> -1
c    ( b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧  p_438) -> ( b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0)
c  in CNF:
c    -b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨  b^{6, 74}_2
c    -b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_1
c    -b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨  b^{6, 74}_0
c  in DIMACS:
-9344 -9345  9346 -438  9347 0
-9344 -9345  9346 -438 -9348 0
-9344 -9345  9346 -438  9349 0

c  -1+1 --> 0
c    ( b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0 ∧  p_438) -> (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧ -b^{6, 74}_0)
c  in CNF:
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_2
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_1
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_0
c  in DIMACS:
-9344  9345 -9346 -438 -9347 0
-9344  9345 -9346 -438 -9348 0
-9344  9345 -9346 -438 -9349 0

c  0+1 --> 1
c    (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧  p_438) -> (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0)
c  in CNF:
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_2
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_1
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨  b^{6, 74}_0
c  in DIMACS:
 9344  9345  9346 -438 -9347 0
 9344  9345  9346 -438 -9348 0
 9344  9345  9346 -438  9349 0

c  1+1 --> 2
c    (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0 ∧  p_438) -> (-b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0)
c  in CNF:
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_2
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨  b^{6, 74}_1
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ -p_438 ∨ -b^{6, 74}_0
c  in DIMACS:
 9344  9345 -9346 -438 -9347 0
 9344  9345 -9346 -438  9348 0
 9344  9345 -9346 -438 -9349 0

c  2+1 --> break 
c    (-b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧  p_438) -> break
c  in CNF:
c     b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 9344 -9345  9346 -438 1162 0


c  2-1 --> 1
c    (-b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧ -p_438) -> (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0)
c  in CNF:
c     b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_2
c     b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_1
c     b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨  b^{6, 74}_0
c  in DIMACS:
 9344 -9345  9346  438 -9347 0
 9344 -9345  9346  438 -9348 0
 9344 -9345  9346  438  9349 0

c  1-1 --> 0
c    (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0 ∧ -p_438) -> (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧ -b^{6, 74}_0)
c  in CNF:
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_2
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_1
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_0
c  in DIMACS:
 9344  9345 -9346  438 -9347 0
 9344  9345 -9346  438 -9348 0
 9344  9345 -9346  438 -9349 0

c  0-1 --> -1
c    (-b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧ -p_438) -> ( b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0)
c  in CNF:
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨  b^{6, 74}_2
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_1
c     b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨  b^{6, 74}_0
c  in DIMACS:
 9344  9345  9346  438  9347 0
 9344  9345  9346  438 -9348 0
 9344  9345  9346  438  9349 0

c  -1-1 --> -2
c    ( b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧  b^{6, 73}_0 ∧ -p_438) -> ( b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0)
c  in CNF:
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨  b^{6, 74}_2
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨  b^{6, 74}_1
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨  p_438 ∨ -b^{6, 74}_0
c  in DIMACS:
-9344  9345 -9346  438  9347 0
-9344  9345 -9346  438  9348 0
-9344  9345 -9346  438 -9349 0

c  -2-1 --> break 
c    ( b^{6, 73}_2 ∧  b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨  b^{6, 73}_0 ∨  p_438 ∨ break
c  in DIMACS:
-9344 -9345  9346  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 73}_2 ∧ -b^{6, 73}_1 ∧ -b^{6, 73}_0 ∧ true) 
c  in CNF:
c    -b^{6, 73}_2 ∨  b^{6, 73}_1 ∨  b^{6, 73}_0 ∨ false 
c  in DIMACS:
-9344  9345  9346  0

c  3 does not represent an automaton state.
c    -(-b^{6, 73}_2 ∧  b^{6, 73}_1 ∧  b^{6, 73}_0 ∧ true) 
c  in CNF:
c     b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ false 
c  in DIMACS:
 9344 -9345 -9346  0
c  -3 does not represent an automaton state.
c    -( b^{6, 73}_2 ∧  b^{6, 73}_1 ∧  b^{6, 73}_0 ∧ true) 
c  in CNF:
c    -b^{6, 73}_2 ∨ -b^{6, 73}_1 ∨ -b^{6, 73}_0 ∨ false 
c  in DIMACS:
-9344 -9345 -9346  0

c i = 74
c  -2+1 --> -1
c    ( b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧  p_444) -> ( b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0)
c  in CNF:
c    -b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨  b^{6, 75}_2
c    -b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_1
c    -b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨  b^{6, 75}_0
c  in DIMACS:
-9347 -9348  9349 -444  9350 0
-9347 -9348  9349 -444 -9351 0
-9347 -9348  9349 -444  9352 0

c  -1+1 --> 0
c    ( b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0 ∧  p_444) -> (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧ -b^{6, 75}_0)
c  in CNF:
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_2
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_1
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_0
c  in DIMACS:
-9347  9348 -9349 -444 -9350 0
-9347  9348 -9349 -444 -9351 0
-9347  9348 -9349 -444 -9352 0

c  0+1 --> 1
c    (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧  p_444) -> (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0)
c  in CNF:
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_2
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_1
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨  b^{6, 75}_0
c  in DIMACS:
 9347  9348  9349 -444 -9350 0
 9347  9348  9349 -444 -9351 0
 9347  9348  9349 -444  9352 0

c  1+1 --> 2
c    (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0 ∧  p_444) -> (-b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0)
c  in CNF:
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_2
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨  b^{6, 75}_1
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ -p_444 ∨ -b^{6, 75}_0
c  in DIMACS:
 9347  9348 -9349 -444 -9350 0
 9347  9348 -9349 -444  9351 0
 9347  9348 -9349 -444 -9352 0

c  2+1 --> break 
c    (-b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧  p_444) -> break
c  in CNF:
c     b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 9347 -9348  9349 -444 1162 0


c  2-1 --> 1
c    (-b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧ -p_444) -> (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0)
c  in CNF:
c     b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_2
c     b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_1
c     b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨  b^{6, 75}_0
c  in DIMACS:
 9347 -9348  9349  444 -9350 0
 9347 -9348  9349  444 -9351 0
 9347 -9348  9349  444  9352 0

c  1-1 --> 0
c    (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0 ∧ -p_444) -> (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧ -b^{6, 75}_0)
c  in CNF:
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_2
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_1
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_0
c  in DIMACS:
 9347  9348 -9349  444 -9350 0
 9347  9348 -9349  444 -9351 0
 9347  9348 -9349  444 -9352 0

c  0-1 --> -1
c    (-b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧ -p_444) -> ( b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0)
c  in CNF:
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨  b^{6, 75}_2
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_1
c     b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨  b^{6, 75}_0
c  in DIMACS:
 9347  9348  9349  444  9350 0
 9347  9348  9349  444 -9351 0
 9347  9348  9349  444  9352 0

c  -1-1 --> -2
c    ( b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧  b^{6, 74}_0 ∧ -p_444) -> ( b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0)
c  in CNF:
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨  b^{6, 75}_2
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨  b^{6, 75}_1
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨  p_444 ∨ -b^{6, 75}_0
c  in DIMACS:
-9347  9348 -9349  444  9350 0
-9347  9348 -9349  444  9351 0
-9347  9348 -9349  444 -9352 0

c  -2-1 --> break 
c    ( b^{6, 74}_2 ∧  b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨  b^{6, 74}_0 ∨  p_444 ∨ break
c  in DIMACS:
-9347 -9348  9349  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 74}_2 ∧ -b^{6, 74}_1 ∧ -b^{6, 74}_0 ∧ true) 
c  in CNF:
c    -b^{6, 74}_2 ∨  b^{6, 74}_1 ∨  b^{6, 74}_0 ∨ false 
c  in DIMACS:
-9347  9348  9349  0

c  3 does not represent an automaton state.
c    -(-b^{6, 74}_2 ∧  b^{6, 74}_1 ∧  b^{6, 74}_0 ∧ true) 
c  in CNF:
c     b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ false 
c  in DIMACS:
 9347 -9348 -9349  0
c  -3 does not represent an automaton state.
c    -( b^{6, 74}_2 ∧  b^{6, 74}_1 ∧  b^{6, 74}_0 ∧ true) 
c  in CNF:
c    -b^{6, 74}_2 ∨ -b^{6, 74}_1 ∨ -b^{6, 74}_0 ∨ false 
c  in DIMACS:
-9347 -9348 -9349  0

c i = 75
c  -2+1 --> -1
c    ( b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧  p_450) -> ( b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0)
c  in CNF:
c    -b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨  b^{6, 76}_2
c    -b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_1
c    -b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨  b^{6, 76}_0
c  in DIMACS:
-9350 -9351  9352 -450  9353 0
-9350 -9351  9352 -450 -9354 0
-9350 -9351  9352 -450  9355 0

c  -1+1 --> 0
c    ( b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0 ∧  p_450) -> (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧ -b^{6, 76}_0)
c  in CNF:
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_2
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_1
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_0
c  in DIMACS:
-9350  9351 -9352 -450 -9353 0
-9350  9351 -9352 -450 -9354 0
-9350  9351 -9352 -450 -9355 0

c  0+1 --> 1
c    (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧  p_450) -> (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0)
c  in CNF:
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_2
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_1
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨  b^{6, 76}_0
c  in DIMACS:
 9350  9351  9352 -450 -9353 0
 9350  9351  9352 -450 -9354 0
 9350  9351  9352 -450  9355 0

c  1+1 --> 2
c    (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0 ∧  p_450) -> (-b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0)
c  in CNF:
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_2
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨  b^{6, 76}_1
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ -p_450 ∨ -b^{6, 76}_0
c  in DIMACS:
 9350  9351 -9352 -450 -9353 0
 9350  9351 -9352 -450  9354 0
 9350  9351 -9352 -450 -9355 0

c  2+1 --> break 
c    (-b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧  p_450) -> break
c  in CNF:
c     b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 9350 -9351  9352 -450 1162 0


c  2-1 --> 1
c    (-b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧ -p_450) -> (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0)
c  in CNF:
c     b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_2
c     b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_1
c     b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨  b^{6, 76}_0
c  in DIMACS:
 9350 -9351  9352  450 -9353 0
 9350 -9351  9352  450 -9354 0
 9350 -9351  9352  450  9355 0

c  1-1 --> 0
c    (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0 ∧ -p_450) -> (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧ -b^{6, 76}_0)
c  in CNF:
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_2
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_1
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_0
c  in DIMACS:
 9350  9351 -9352  450 -9353 0
 9350  9351 -9352  450 -9354 0
 9350  9351 -9352  450 -9355 0

c  0-1 --> -1
c    (-b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧ -p_450) -> ( b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0)
c  in CNF:
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨  b^{6, 76}_2
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_1
c     b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨  b^{6, 76}_0
c  in DIMACS:
 9350  9351  9352  450  9353 0
 9350  9351  9352  450 -9354 0
 9350  9351  9352  450  9355 0

c  -1-1 --> -2
c    ( b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧  b^{6, 75}_0 ∧ -p_450) -> ( b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0)
c  in CNF:
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨  b^{6, 76}_2
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨  b^{6, 76}_1
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨  p_450 ∨ -b^{6, 76}_0
c  in DIMACS:
-9350  9351 -9352  450  9353 0
-9350  9351 -9352  450  9354 0
-9350  9351 -9352  450 -9355 0

c  -2-1 --> break 
c    ( b^{6, 75}_2 ∧  b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨  b^{6, 75}_0 ∨  p_450 ∨ break
c  in DIMACS:
-9350 -9351  9352  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 75}_2 ∧ -b^{6, 75}_1 ∧ -b^{6, 75}_0 ∧ true) 
c  in CNF:
c    -b^{6, 75}_2 ∨  b^{6, 75}_1 ∨  b^{6, 75}_0 ∨ false 
c  in DIMACS:
-9350  9351  9352  0

c  3 does not represent an automaton state.
c    -(-b^{6, 75}_2 ∧  b^{6, 75}_1 ∧  b^{6, 75}_0 ∧ true) 
c  in CNF:
c     b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ false 
c  in DIMACS:
 9350 -9351 -9352  0
c  -3 does not represent an automaton state.
c    -( b^{6, 75}_2 ∧  b^{6, 75}_1 ∧  b^{6, 75}_0 ∧ true) 
c  in CNF:
c    -b^{6, 75}_2 ∨ -b^{6, 75}_1 ∨ -b^{6, 75}_0 ∨ false 
c  in DIMACS:
-9350 -9351 -9352  0

c i = 76
c  -2+1 --> -1
c    ( b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧  p_456) -> ( b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0)
c  in CNF:
c    -b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨  b^{6, 77}_2
c    -b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_1
c    -b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨  b^{6, 77}_0
c  in DIMACS:
-9353 -9354  9355 -456  9356 0
-9353 -9354  9355 -456 -9357 0
-9353 -9354  9355 -456  9358 0

c  -1+1 --> 0
c    ( b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0 ∧  p_456) -> (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧ -b^{6, 77}_0)
c  in CNF:
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_2
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_1
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_0
c  in DIMACS:
-9353  9354 -9355 -456 -9356 0
-9353  9354 -9355 -456 -9357 0
-9353  9354 -9355 -456 -9358 0

c  0+1 --> 1
c    (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧  p_456) -> (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0)
c  in CNF:
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_2
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_1
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨  b^{6, 77}_0
c  in DIMACS:
 9353  9354  9355 -456 -9356 0
 9353  9354  9355 -456 -9357 0
 9353  9354  9355 -456  9358 0

c  1+1 --> 2
c    (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0 ∧  p_456) -> (-b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0)
c  in CNF:
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_2
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨  b^{6, 77}_1
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ -p_456 ∨ -b^{6, 77}_0
c  in DIMACS:
 9353  9354 -9355 -456 -9356 0
 9353  9354 -9355 -456  9357 0
 9353  9354 -9355 -456 -9358 0

c  2+1 --> break 
c    (-b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧  p_456) -> break
c  in CNF:
c     b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 9353 -9354  9355 -456 1162 0


c  2-1 --> 1
c    (-b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧ -p_456) -> (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0)
c  in CNF:
c     b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_2
c     b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_1
c     b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨  b^{6, 77}_0
c  in DIMACS:
 9353 -9354  9355  456 -9356 0
 9353 -9354  9355  456 -9357 0
 9353 -9354  9355  456  9358 0

c  1-1 --> 0
c    (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0 ∧ -p_456) -> (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧ -b^{6, 77}_0)
c  in CNF:
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_2
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_1
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_0
c  in DIMACS:
 9353  9354 -9355  456 -9356 0
 9353  9354 -9355  456 -9357 0
 9353  9354 -9355  456 -9358 0

c  0-1 --> -1
c    (-b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧ -p_456) -> ( b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0)
c  in CNF:
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨  b^{6, 77}_2
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_1
c     b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨  b^{6, 77}_0
c  in DIMACS:
 9353  9354  9355  456  9356 0
 9353  9354  9355  456 -9357 0
 9353  9354  9355  456  9358 0

c  -1-1 --> -2
c    ( b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧  b^{6, 76}_0 ∧ -p_456) -> ( b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0)
c  in CNF:
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨  b^{6, 77}_2
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨  b^{6, 77}_1
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨  p_456 ∨ -b^{6, 77}_0
c  in DIMACS:
-9353  9354 -9355  456  9356 0
-9353  9354 -9355  456  9357 0
-9353  9354 -9355  456 -9358 0

c  -2-1 --> break 
c    ( b^{6, 76}_2 ∧  b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨  b^{6, 76}_0 ∨  p_456 ∨ break
c  in DIMACS:
-9353 -9354  9355  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 76}_2 ∧ -b^{6, 76}_1 ∧ -b^{6, 76}_0 ∧ true) 
c  in CNF:
c    -b^{6, 76}_2 ∨  b^{6, 76}_1 ∨  b^{6, 76}_0 ∨ false 
c  in DIMACS:
-9353  9354  9355  0

c  3 does not represent an automaton state.
c    -(-b^{6, 76}_2 ∧  b^{6, 76}_1 ∧  b^{6, 76}_0 ∧ true) 
c  in CNF:
c     b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ false 
c  in DIMACS:
 9353 -9354 -9355  0
c  -3 does not represent an automaton state.
c    -( b^{6, 76}_2 ∧  b^{6, 76}_1 ∧  b^{6, 76}_0 ∧ true) 
c  in CNF:
c    -b^{6, 76}_2 ∨ -b^{6, 76}_1 ∨ -b^{6, 76}_0 ∨ false 
c  in DIMACS:
-9353 -9354 -9355  0

c i = 77
c  -2+1 --> -1
c    ( b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧  p_462) -> ( b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0)
c  in CNF:
c    -b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨  b^{6, 78}_2
c    -b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_1
c    -b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨  b^{6, 78}_0
c  in DIMACS:
-9356 -9357  9358 -462  9359 0
-9356 -9357  9358 -462 -9360 0
-9356 -9357  9358 -462  9361 0

c  -1+1 --> 0
c    ( b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0 ∧  p_462) -> (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧ -b^{6, 78}_0)
c  in CNF:
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_2
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_1
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_0
c  in DIMACS:
-9356  9357 -9358 -462 -9359 0
-9356  9357 -9358 -462 -9360 0
-9356  9357 -9358 -462 -9361 0

c  0+1 --> 1
c    (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧  p_462) -> (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0)
c  in CNF:
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_2
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_1
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨  b^{6, 78}_0
c  in DIMACS:
 9356  9357  9358 -462 -9359 0
 9356  9357  9358 -462 -9360 0
 9356  9357  9358 -462  9361 0

c  1+1 --> 2
c    (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0 ∧  p_462) -> (-b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0)
c  in CNF:
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_2
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨  b^{6, 78}_1
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ -p_462 ∨ -b^{6, 78}_0
c  in DIMACS:
 9356  9357 -9358 -462 -9359 0
 9356  9357 -9358 -462  9360 0
 9356  9357 -9358 -462 -9361 0

c  2+1 --> break 
c    (-b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧  p_462) -> break
c  in CNF:
c     b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 9356 -9357  9358 -462 1162 0


c  2-1 --> 1
c    (-b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧ -p_462) -> (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0)
c  in CNF:
c     b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_2
c     b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_1
c     b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨  b^{6, 78}_0
c  in DIMACS:
 9356 -9357  9358  462 -9359 0
 9356 -9357  9358  462 -9360 0
 9356 -9357  9358  462  9361 0

c  1-1 --> 0
c    (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0 ∧ -p_462) -> (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧ -b^{6, 78}_0)
c  in CNF:
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_2
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_1
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_0
c  in DIMACS:
 9356  9357 -9358  462 -9359 0
 9356  9357 -9358  462 -9360 0
 9356  9357 -9358  462 -9361 0

c  0-1 --> -1
c    (-b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧ -p_462) -> ( b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0)
c  in CNF:
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨  b^{6, 78}_2
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_1
c     b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨  b^{6, 78}_0
c  in DIMACS:
 9356  9357  9358  462  9359 0
 9356  9357  9358  462 -9360 0
 9356  9357  9358  462  9361 0

c  -1-1 --> -2
c    ( b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧  b^{6, 77}_0 ∧ -p_462) -> ( b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0)
c  in CNF:
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨  b^{6, 78}_2
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨  b^{6, 78}_1
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨  p_462 ∨ -b^{6, 78}_0
c  in DIMACS:
-9356  9357 -9358  462  9359 0
-9356  9357 -9358  462  9360 0
-9356  9357 -9358  462 -9361 0

c  -2-1 --> break 
c    ( b^{6, 77}_2 ∧  b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨  b^{6, 77}_0 ∨  p_462 ∨ break
c  in DIMACS:
-9356 -9357  9358  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 77}_2 ∧ -b^{6, 77}_1 ∧ -b^{6, 77}_0 ∧ true) 
c  in CNF:
c    -b^{6, 77}_2 ∨  b^{6, 77}_1 ∨  b^{6, 77}_0 ∨ false 
c  in DIMACS:
-9356  9357  9358  0

c  3 does not represent an automaton state.
c    -(-b^{6, 77}_2 ∧  b^{6, 77}_1 ∧  b^{6, 77}_0 ∧ true) 
c  in CNF:
c     b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ false 
c  in DIMACS:
 9356 -9357 -9358  0
c  -3 does not represent an automaton state.
c    -( b^{6, 77}_2 ∧  b^{6, 77}_1 ∧  b^{6, 77}_0 ∧ true) 
c  in CNF:
c    -b^{6, 77}_2 ∨ -b^{6, 77}_1 ∨ -b^{6, 77}_0 ∨ false 
c  in DIMACS:
-9356 -9357 -9358  0

c i = 78
c  -2+1 --> -1
c    ( b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧  p_468) -> ( b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0)
c  in CNF:
c    -b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨  b^{6, 79}_2
c    -b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_1
c    -b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨  b^{6, 79}_0
c  in DIMACS:
-9359 -9360  9361 -468  9362 0
-9359 -9360  9361 -468 -9363 0
-9359 -9360  9361 -468  9364 0

c  -1+1 --> 0
c    ( b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0 ∧  p_468) -> (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧ -b^{6, 79}_0)
c  in CNF:
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_2
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_1
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_0
c  in DIMACS:
-9359  9360 -9361 -468 -9362 0
-9359  9360 -9361 -468 -9363 0
-9359  9360 -9361 -468 -9364 0

c  0+1 --> 1
c    (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧  p_468) -> (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0)
c  in CNF:
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_2
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_1
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨  b^{6, 79}_0
c  in DIMACS:
 9359  9360  9361 -468 -9362 0
 9359  9360  9361 -468 -9363 0
 9359  9360  9361 -468  9364 0

c  1+1 --> 2
c    (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0 ∧  p_468) -> (-b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0)
c  in CNF:
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_2
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨  b^{6, 79}_1
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ -p_468 ∨ -b^{6, 79}_0
c  in DIMACS:
 9359  9360 -9361 -468 -9362 0
 9359  9360 -9361 -468  9363 0
 9359  9360 -9361 -468 -9364 0

c  2+1 --> break 
c    (-b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧  p_468) -> break
c  in CNF:
c     b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 9359 -9360  9361 -468 1162 0


c  2-1 --> 1
c    (-b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧ -p_468) -> (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0)
c  in CNF:
c     b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_2
c     b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_1
c     b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨  b^{6, 79}_0
c  in DIMACS:
 9359 -9360  9361  468 -9362 0
 9359 -9360  9361  468 -9363 0
 9359 -9360  9361  468  9364 0

c  1-1 --> 0
c    (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0 ∧ -p_468) -> (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧ -b^{6, 79}_0)
c  in CNF:
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_2
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_1
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_0
c  in DIMACS:
 9359  9360 -9361  468 -9362 0
 9359  9360 -9361  468 -9363 0
 9359  9360 -9361  468 -9364 0

c  0-1 --> -1
c    (-b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧ -p_468) -> ( b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0)
c  in CNF:
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨  b^{6, 79}_2
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_1
c     b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨  b^{6, 79}_0
c  in DIMACS:
 9359  9360  9361  468  9362 0
 9359  9360  9361  468 -9363 0
 9359  9360  9361  468  9364 0

c  -1-1 --> -2
c    ( b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧  b^{6, 78}_0 ∧ -p_468) -> ( b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0)
c  in CNF:
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨  b^{6, 79}_2
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨  b^{6, 79}_1
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨  p_468 ∨ -b^{6, 79}_0
c  in DIMACS:
-9359  9360 -9361  468  9362 0
-9359  9360 -9361  468  9363 0
-9359  9360 -9361  468 -9364 0

c  -2-1 --> break 
c    ( b^{6, 78}_2 ∧  b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨  b^{6, 78}_0 ∨  p_468 ∨ break
c  in DIMACS:
-9359 -9360  9361  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 78}_2 ∧ -b^{6, 78}_1 ∧ -b^{6, 78}_0 ∧ true) 
c  in CNF:
c    -b^{6, 78}_2 ∨  b^{6, 78}_1 ∨  b^{6, 78}_0 ∨ false 
c  in DIMACS:
-9359  9360  9361  0

c  3 does not represent an automaton state.
c    -(-b^{6, 78}_2 ∧  b^{6, 78}_1 ∧  b^{6, 78}_0 ∧ true) 
c  in CNF:
c     b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ false 
c  in DIMACS:
 9359 -9360 -9361  0
c  -3 does not represent an automaton state.
c    -( b^{6, 78}_2 ∧  b^{6, 78}_1 ∧  b^{6, 78}_0 ∧ true) 
c  in CNF:
c    -b^{6, 78}_2 ∨ -b^{6, 78}_1 ∨ -b^{6, 78}_0 ∨ false 
c  in DIMACS:
-9359 -9360 -9361  0

c i = 79
c  -2+1 --> -1
c    ( b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧  p_474) -> ( b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0)
c  in CNF:
c    -b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨  b^{6, 80}_2
c    -b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_1
c    -b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨  b^{6, 80}_0
c  in DIMACS:
-9362 -9363  9364 -474  9365 0
-9362 -9363  9364 -474 -9366 0
-9362 -9363  9364 -474  9367 0

c  -1+1 --> 0
c    ( b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0 ∧  p_474) -> (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧ -b^{6, 80}_0)
c  in CNF:
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_2
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_1
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_0
c  in DIMACS:
-9362  9363 -9364 -474 -9365 0
-9362  9363 -9364 -474 -9366 0
-9362  9363 -9364 -474 -9367 0

c  0+1 --> 1
c    (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧  p_474) -> (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0)
c  in CNF:
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_2
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_1
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨  b^{6, 80}_0
c  in DIMACS:
 9362  9363  9364 -474 -9365 0
 9362  9363  9364 -474 -9366 0
 9362  9363  9364 -474  9367 0

c  1+1 --> 2
c    (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0 ∧  p_474) -> (-b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0)
c  in CNF:
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_2
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨  b^{6, 80}_1
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ -p_474 ∨ -b^{6, 80}_0
c  in DIMACS:
 9362  9363 -9364 -474 -9365 0
 9362  9363 -9364 -474  9366 0
 9362  9363 -9364 -474 -9367 0

c  2+1 --> break 
c    (-b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧  p_474) -> break
c  in CNF:
c     b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 9362 -9363  9364 -474 1162 0


c  2-1 --> 1
c    (-b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧ -p_474) -> (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0)
c  in CNF:
c     b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_2
c     b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_1
c     b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨  b^{6, 80}_0
c  in DIMACS:
 9362 -9363  9364  474 -9365 0
 9362 -9363  9364  474 -9366 0
 9362 -9363  9364  474  9367 0

c  1-1 --> 0
c    (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0 ∧ -p_474) -> (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧ -b^{6, 80}_0)
c  in CNF:
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_2
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_1
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_0
c  in DIMACS:
 9362  9363 -9364  474 -9365 0
 9362  9363 -9364  474 -9366 0
 9362  9363 -9364  474 -9367 0

c  0-1 --> -1
c    (-b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧ -p_474) -> ( b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0)
c  in CNF:
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨  b^{6, 80}_2
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_1
c     b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨  b^{6, 80}_0
c  in DIMACS:
 9362  9363  9364  474  9365 0
 9362  9363  9364  474 -9366 0
 9362  9363  9364  474  9367 0

c  -1-1 --> -2
c    ( b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧  b^{6, 79}_0 ∧ -p_474) -> ( b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0)
c  in CNF:
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨  b^{6, 80}_2
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨  b^{6, 80}_1
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨  p_474 ∨ -b^{6, 80}_0
c  in DIMACS:
-9362  9363 -9364  474  9365 0
-9362  9363 -9364  474  9366 0
-9362  9363 -9364  474 -9367 0

c  -2-1 --> break 
c    ( b^{6, 79}_2 ∧  b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨  b^{6, 79}_0 ∨  p_474 ∨ break
c  in DIMACS:
-9362 -9363  9364  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 79}_2 ∧ -b^{6, 79}_1 ∧ -b^{6, 79}_0 ∧ true) 
c  in CNF:
c    -b^{6, 79}_2 ∨  b^{6, 79}_1 ∨  b^{6, 79}_0 ∨ false 
c  in DIMACS:
-9362  9363  9364  0

c  3 does not represent an automaton state.
c    -(-b^{6, 79}_2 ∧  b^{6, 79}_1 ∧  b^{6, 79}_0 ∧ true) 
c  in CNF:
c     b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ false 
c  in DIMACS:
 9362 -9363 -9364  0
c  -3 does not represent an automaton state.
c    -( b^{6, 79}_2 ∧  b^{6, 79}_1 ∧  b^{6, 79}_0 ∧ true) 
c  in CNF:
c    -b^{6, 79}_2 ∨ -b^{6, 79}_1 ∨ -b^{6, 79}_0 ∨ false 
c  in DIMACS:
-9362 -9363 -9364  0

c i = 80
c  -2+1 --> -1
c    ( b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧  p_480) -> ( b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0)
c  in CNF:
c    -b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨  b^{6, 81}_2
c    -b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_1
c    -b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨  b^{6, 81}_0
c  in DIMACS:
-9365 -9366  9367 -480  9368 0
-9365 -9366  9367 -480 -9369 0
-9365 -9366  9367 -480  9370 0

c  -1+1 --> 0
c    ( b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0 ∧  p_480) -> (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧ -b^{6, 81}_0)
c  in CNF:
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_2
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_1
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_0
c  in DIMACS:
-9365  9366 -9367 -480 -9368 0
-9365  9366 -9367 -480 -9369 0
-9365  9366 -9367 -480 -9370 0

c  0+1 --> 1
c    (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧  p_480) -> (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0)
c  in CNF:
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_2
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_1
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨  b^{6, 81}_0
c  in DIMACS:
 9365  9366  9367 -480 -9368 0
 9365  9366  9367 -480 -9369 0
 9365  9366  9367 -480  9370 0

c  1+1 --> 2
c    (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0 ∧  p_480) -> (-b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0)
c  in CNF:
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_2
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨  b^{6, 81}_1
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ -p_480 ∨ -b^{6, 81}_0
c  in DIMACS:
 9365  9366 -9367 -480 -9368 0
 9365  9366 -9367 -480  9369 0
 9365  9366 -9367 -480 -9370 0

c  2+1 --> break 
c    (-b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧  p_480) -> break
c  in CNF:
c     b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 9365 -9366  9367 -480 1162 0


c  2-1 --> 1
c    (-b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧ -p_480) -> (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0)
c  in CNF:
c     b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_2
c     b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_1
c     b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨  b^{6, 81}_0
c  in DIMACS:
 9365 -9366  9367  480 -9368 0
 9365 -9366  9367  480 -9369 0
 9365 -9366  9367  480  9370 0

c  1-1 --> 0
c    (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0 ∧ -p_480) -> (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧ -b^{6, 81}_0)
c  in CNF:
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_2
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_1
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_0
c  in DIMACS:
 9365  9366 -9367  480 -9368 0
 9365  9366 -9367  480 -9369 0
 9365  9366 -9367  480 -9370 0

c  0-1 --> -1
c    (-b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧ -p_480) -> ( b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0)
c  in CNF:
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨  b^{6, 81}_2
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_1
c     b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨  b^{6, 81}_0
c  in DIMACS:
 9365  9366  9367  480  9368 0
 9365  9366  9367  480 -9369 0
 9365  9366  9367  480  9370 0

c  -1-1 --> -2
c    ( b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧  b^{6, 80}_0 ∧ -p_480) -> ( b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0)
c  in CNF:
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨  b^{6, 81}_2
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨  b^{6, 81}_1
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨  p_480 ∨ -b^{6, 81}_0
c  in DIMACS:
-9365  9366 -9367  480  9368 0
-9365  9366 -9367  480  9369 0
-9365  9366 -9367  480 -9370 0

c  -2-1 --> break 
c    ( b^{6, 80}_2 ∧  b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨  b^{6, 80}_0 ∨  p_480 ∨ break
c  in DIMACS:
-9365 -9366  9367  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 80}_2 ∧ -b^{6, 80}_1 ∧ -b^{6, 80}_0 ∧ true) 
c  in CNF:
c    -b^{6, 80}_2 ∨  b^{6, 80}_1 ∨  b^{6, 80}_0 ∨ false 
c  in DIMACS:
-9365  9366  9367  0

c  3 does not represent an automaton state.
c    -(-b^{6, 80}_2 ∧  b^{6, 80}_1 ∧  b^{6, 80}_0 ∧ true) 
c  in CNF:
c     b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ false 
c  in DIMACS:
 9365 -9366 -9367  0
c  -3 does not represent an automaton state.
c    -( b^{6, 80}_2 ∧  b^{6, 80}_1 ∧  b^{6, 80}_0 ∧ true) 
c  in CNF:
c    -b^{6, 80}_2 ∨ -b^{6, 80}_1 ∨ -b^{6, 80}_0 ∨ false 
c  in DIMACS:
-9365 -9366 -9367  0

c i = 81
c  -2+1 --> -1
c    ( b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧  p_486) -> ( b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0)
c  in CNF:
c    -b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨  b^{6, 82}_2
c    -b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_1
c    -b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨  b^{6, 82}_0
c  in DIMACS:
-9368 -9369  9370 -486  9371 0
-9368 -9369  9370 -486 -9372 0
-9368 -9369  9370 -486  9373 0

c  -1+1 --> 0
c    ( b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0 ∧  p_486) -> (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧ -b^{6, 82}_0)
c  in CNF:
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_2
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_1
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_0
c  in DIMACS:
-9368  9369 -9370 -486 -9371 0
-9368  9369 -9370 -486 -9372 0
-9368  9369 -9370 -486 -9373 0

c  0+1 --> 1
c    (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧  p_486) -> (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0)
c  in CNF:
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_2
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_1
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨  b^{6, 82}_0
c  in DIMACS:
 9368  9369  9370 -486 -9371 0
 9368  9369  9370 -486 -9372 0
 9368  9369  9370 -486  9373 0

c  1+1 --> 2
c    (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0 ∧  p_486) -> (-b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0)
c  in CNF:
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_2
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨  b^{6, 82}_1
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ -p_486 ∨ -b^{6, 82}_0
c  in DIMACS:
 9368  9369 -9370 -486 -9371 0
 9368  9369 -9370 -486  9372 0
 9368  9369 -9370 -486 -9373 0

c  2+1 --> break 
c    (-b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧  p_486) -> break
c  in CNF:
c     b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 9368 -9369  9370 -486 1162 0


c  2-1 --> 1
c    (-b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧ -p_486) -> (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0)
c  in CNF:
c     b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_2
c     b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_1
c     b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨  b^{6, 82}_0
c  in DIMACS:
 9368 -9369  9370  486 -9371 0
 9368 -9369  9370  486 -9372 0
 9368 -9369  9370  486  9373 0

c  1-1 --> 0
c    (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0 ∧ -p_486) -> (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧ -b^{6, 82}_0)
c  in CNF:
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_2
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_1
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_0
c  in DIMACS:
 9368  9369 -9370  486 -9371 0
 9368  9369 -9370  486 -9372 0
 9368  9369 -9370  486 -9373 0

c  0-1 --> -1
c    (-b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧ -p_486) -> ( b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0)
c  in CNF:
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨  b^{6, 82}_2
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_1
c     b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨  b^{6, 82}_0
c  in DIMACS:
 9368  9369  9370  486  9371 0
 9368  9369  9370  486 -9372 0
 9368  9369  9370  486  9373 0

c  -1-1 --> -2
c    ( b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧  b^{6, 81}_0 ∧ -p_486) -> ( b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0)
c  in CNF:
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨  b^{6, 82}_2
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨  b^{6, 82}_1
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨  p_486 ∨ -b^{6, 82}_0
c  in DIMACS:
-9368  9369 -9370  486  9371 0
-9368  9369 -9370  486  9372 0
-9368  9369 -9370  486 -9373 0

c  -2-1 --> break 
c    ( b^{6, 81}_2 ∧  b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨  b^{6, 81}_0 ∨  p_486 ∨ break
c  in DIMACS:
-9368 -9369  9370  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 81}_2 ∧ -b^{6, 81}_1 ∧ -b^{6, 81}_0 ∧ true) 
c  in CNF:
c    -b^{6, 81}_2 ∨  b^{6, 81}_1 ∨  b^{6, 81}_0 ∨ false 
c  in DIMACS:
-9368  9369  9370  0

c  3 does not represent an automaton state.
c    -(-b^{6, 81}_2 ∧  b^{6, 81}_1 ∧  b^{6, 81}_0 ∧ true) 
c  in CNF:
c     b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ false 
c  in DIMACS:
 9368 -9369 -9370  0
c  -3 does not represent an automaton state.
c    -( b^{6, 81}_2 ∧  b^{6, 81}_1 ∧  b^{6, 81}_0 ∧ true) 
c  in CNF:
c    -b^{6, 81}_2 ∨ -b^{6, 81}_1 ∨ -b^{6, 81}_0 ∨ false 
c  in DIMACS:
-9368 -9369 -9370  0

c i = 82
c  -2+1 --> -1
c    ( b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧  p_492) -> ( b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0)
c  in CNF:
c    -b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨  b^{6, 83}_2
c    -b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_1
c    -b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨  b^{6, 83}_0
c  in DIMACS:
-9371 -9372  9373 -492  9374 0
-9371 -9372  9373 -492 -9375 0
-9371 -9372  9373 -492  9376 0

c  -1+1 --> 0
c    ( b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0 ∧  p_492) -> (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧ -b^{6, 83}_0)
c  in CNF:
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_2
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_1
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_0
c  in DIMACS:
-9371  9372 -9373 -492 -9374 0
-9371  9372 -9373 -492 -9375 0
-9371  9372 -9373 -492 -9376 0

c  0+1 --> 1
c    (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧  p_492) -> (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0)
c  in CNF:
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_2
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_1
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨  b^{6, 83}_0
c  in DIMACS:
 9371  9372  9373 -492 -9374 0
 9371  9372  9373 -492 -9375 0
 9371  9372  9373 -492  9376 0

c  1+1 --> 2
c    (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0 ∧  p_492) -> (-b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0)
c  in CNF:
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_2
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨  b^{6, 83}_1
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ -p_492 ∨ -b^{6, 83}_0
c  in DIMACS:
 9371  9372 -9373 -492 -9374 0
 9371  9372 -9373 -492  9375 0
 9371  9372 -9373 -492 -9376 0

c  2+1 --> break 
c    (-b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧  p_492) -> break
c  in CNF:
c     b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 9371 -9372  9373 -492 1162 0


c  2-1 --> 1
c    (-b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧ -p_492) -> (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0)
c  in CNF:
c     b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_2
c     b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_1
c     b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨  b^{6, 83}_0
c  in DIMACS:
 9371 -9372  9373  492 -9374 0
 9371 -9372  9373  492 -9375 0
 9371 -9372  9373  492  9376 0

c  1-1 --> 0
c    (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0 ∧ -p_492) -> (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧ -b^{6, 83}_0)
c  in CNF:
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_2
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_1
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_0
c  in DIMACS:
 9371  9372 -9373  492 -9374 0
 9371  9372 -9373  492 -9375 0
 9371  9372 -9373  492 -9376 0

c  0-1 --> -1
c    (-b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧ -p_492) -> ( b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0)
c  in CNF:
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨  b^{6, 83}_2
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_1
c     b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨  b^{6, 83}_0
c  in DIMACS:
 9371  9372  9373  492  9374 0
 9371  9372  9373  492 -9375 0
 9371  9372  9373  492  9376 0

c  -1-1 --> -2
c    ( b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧  b^{6, 82}_0 ∧ -p_492) -> ( b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0)
c  in CNF:
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨  b^{6, 83}_2
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨  b^{6, 83}_1
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨  p_492 ∨ -b^{6, 83}_0
c  in DIMACS:
-9371  9372 -9373  492  9374 0
-9371  9372 -9373  492  9375 0
-9371  9372 -9373  492 -9376 0

c  -2-1 --> break 
c    ( b^{6, 82}_2 ∧  b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨  b^{6, 82}_0 ∨  p_492 ∨ break
c  in DIMACS:
-9371 -9372  9373  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 82}_2 ∧ -b^{6, 82}_1 ∧ -b^{6, 82}_0 ∧ true) 
c  in CNF:
c    -b^{6, 82}_2 ∨  b^{6, 82}_1 ∨  b^{6, 82}_0 ∨ false 
c  in DIMACS:
-9371  9372  9373  0

c  3 does not represent an automaton state.
c    -(-b^{6, 82}_2 ∧  b^{6, 82}_1 ∧  b^{6, 82}_0 ∧ true) 
c  in CNF:
c     b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ false 
c  in DIMACS:
 9371 -9372 -9373  0
c  -3 does not represent an automaton state.
c    -( b^{6, 82}_2 ∧  b^{6, 82}_1 ∧  b^{6, 82}_0 ∧ true) 
c  in CNF:
c    -b^{6, 82}_2 ∨ -b^{6, 82}_1 ∨ -b^{6, 82}_0 ∨ false 
c  in DIMACS:
-9371 -9372 -9373  0

c i = 83
c  -2+1 --> -1
c    ( b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧  p_498) -> ( b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0)
c  in CNF:
c    -b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨  b^{6, 84}_2
c    -b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_1
c    -b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨  b^{6, 84}_0
c  in DIMACS:
-9374 -9375  9376 -498  9377 0
-9374 -9375  9376 -498 -9378 0
-9374 -9375  9376 -498  9379 0

c  -1+1 --> 0
c    ( b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0 ∧  p_498) -> (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧ -b^{6, 84}_0)
c  in CNF:
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_2
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_1
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_0
c  in DIMACS:
-9374  9375 -9376 -498 -9377 0
-9374  9375 -9376 -498 -9378 0
-9374  9375 -9376 -498 -9379 0

c  0+1 --> 1
c    (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧  p_498) -> (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0)
c  in CNF:
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_2
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_1
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨  b^{6, 84}_0
c  in DIMACS:
 9374  9375  9376 -498 -9377 0
 9374  9375  9376 -498 -9378 0
 9374  9375  9376 -498  9379 0

c  1+1 --> 2
c    (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0 ∧  p_498) -> (-b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0)
c  in CNF:
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_2
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨  b^{6, 84}_1
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ -p_498 ∨ -b^{6, 84}_0
c  in DIMACS:
 9374  9375 -9376 -498 -9377 0
 9374  9375 -9376 -498  9378 0
 9374  9375 -9376 -498 -9379 0

c  2+1 --> break 
c    (-b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧  p_498) -> break
c  in CNF:
c     b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 9374 -9375  9376 -498 1162 0


c  2-1 --> 1
c    (-b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧ -p_498) -> (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0)
c  in CNF:
c     b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_2
c     b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_1
c     b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨  b^{6, 84}_0
c  in DIMACS:
 9374 -9375  9376  498 -9377 0
 9374 -9375  9376  498 -9378 0
 9374 -9375  9376  498  9379 0

c  1-1 --> 0
c    (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0 ∧ -p_498) -> (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧ -b^{6, 84}_0)
c  in CNF:
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_2
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_1
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_0
c  in DIMACS:
 9374  9375 -9376  498 -9377 0
 9374  9375 -9376  498 -9378 0
 9374  9375 -9376  498 -9379 0

c  0-1 --> -1
c    (-b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧ -p_498) -> ( b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0)
c  in CNF:
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨  b^{6, 84}_2
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_1
c     b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨  b^{6, 84}_0
c  in DIMACS:
 9374  9375  9376  498  9377 0
 9374  9375  9376  498 -9378 0
 9374  9375  9376  498  9379 0

c  -1-1 --> -2
c    ( b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧  b^{6, 83}_0 ∧ -p_498) -> ( b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0)
c  in CNF:
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨  b^{6, 84}_2
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨  b^{6, 84}_1
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨  p_498 ∨ -b^{6, 84}_0
c  in DIMACS:
-9374  9375 -9376  498  9377 0
-9374  9375 -9376  498  9378 0
-9374  9375 -9376  498 -9379 0

c  -2-1 --> break 
c    ( b^{6, 83}_2 ∧  b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨  b^{6, 83}_0 ∨  p_498 ∨ break
c  in DIMACS:
-9374 -9375  9376  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 83}_2 ∧ -b^{6, 83}_1 ∧ -b^{6, 83}_0 ∧ true) 
c  in CNF:
c    -b^{6, 83}_2 ∨  b^{6, 83}_1 ∨  b^{6, 83}_0 ∨ false 
c  in DIMACS:
-9374  9375  9376  0

c  3 does not represent an automaton state.
c    -(-b^{6, 83}_2 ∧  b^{6, 83}_1 ∧  b^{6, 83}_0 ∧ true) 
c  in CNF:
c     b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ false 
c  in DIMACS:
 9374 -9375 -9376  0
c  -3 does not represent an automaton state.
c    -( b^{6, 83}_2 ∧  b^{6, 83}_1 ∧  b^{6, 83}_0 ∧ true) 
c  in CNF:
c    -b^{6, 83}_2 ∨ -b^{6, 83}_1 ∨ -b^{6, 83}_0 ∨ false 
c  in DIMACS:
-9374 -9375 -9376  0

c i = 84
c  -2+1 --> -1
c    ( b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧  p_504) -> ( b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0)
c  in CNF:
c    -b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨  b^{6, 85}_2
c    -b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_1
c    -b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨  b^{6, 85}_0
c  in DIMACS:
-9377 -9378  9379 -504  9380 0
-9377 -9378  9379 -504 -9381 0
-9377 -9378  9379 -504  9382 0

c  -1+1 --> 0
c    ( b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0 ∧  p_504) -> (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧ -b^{6, 85}_0)
c  in CNF:
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_2
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_1
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_0
c  in DIMACS:
-9377  9378 -9379 -504 -9380 0
-9377  9378 -9379 -504 -9381 0
-9377  9378 -9379 -504 -9382 0

c  0+1 --> 1
c    (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧  p_504) -> (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0)
c  in CNF:
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_2
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_1
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨  b^{6, 85}_0
c  in DIMACS:
 9377  9378  9379 -504 -9380 0
 9377  9378  9379 -504 -9381 0
 9377  9378  9379 -504  9382 0

c  1+1 --> 2
c    (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0 ∧  p_504) -> (-b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0)
c  in CNF:
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_2
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨  b^{6, 85}_1
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ -p_504 ∨ -b^{6, 85}_0
c  in DIMACS:
 9377  9378 -9379 -504 -9380 0
 9377  9378 -9379 -504  9381 0
 9377  9378 -9379 -504 -9382 0

c  2+1 --> break 
c    (-b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧  p_504) -> break
c  in CNF:
c     b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 9377 -9378  9379 -504 1162 0


c  2-1 --> 1
c    (-b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧ -p_504) -> (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0)
c  in CNF:
c     b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_2
c     b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_1
c     b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨  b^{6, 85}_0
c  in DIMACS:
 9377 -9378  9379  504 -9380 0
 9377 -9378  9379  504 -9381 0
 9377 -9378  9379  504  9382 0

c  1-1 --> 0
c    (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0 ∧ -p_504) -> (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧ -b^{6, 85}_0)
c  in CNF:
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_2
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_1
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_0
c  in DIMACS:
 9377  9378 -9379  504 -9380 0
 9377  9378 -9379  504 -9381 0
 9377  9378 -9379  504 -9382 0

c  0-1 --> -1
c    (-b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧ -p_504) -> ( b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0)
c  in CNF:
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨  b^{6, 85}_2
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_1
c     b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨  b^{6, 85}_0
c  in DIMACS:
 9377  9378  9379  504  9380 0
 9377  9378  9379  504 -9381 0
 9377  9378  9379  504  9382 0

c  -1-1 --> -2
c    ( b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧  b^{6, 84}_0 ∧ -p_504) -> ( b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0)
c  in CNF:
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨  b^{6, 85}_2
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨  b^{6, 85}_1
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨  p_504 ∨ -b^{6, 85}_0
c  in DIMACS:
-9377  9378 -9379  504  9380 0
-9377  9378 -9379  504  9381 0
-9377  9378 -9379  504 -9382 0

c  -2-1 --> break 
c    ( b^{6, 84}_2 ∧  b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨  b^{6, 84}_0 ∨  p_504 ∨ break
c  in DIMACS:
-9377 -9378  9379  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 84}_2 ∧ -b^{6, 84}_1 ∧ -b^{6, 84}_0 ∧ true) 
c  in CNF:
c    -b^{6, 84}_2 ∨  b^{6, 84}_1 ∨  b^{6, 84}_0 ∨ false 
c  in DIMACS:
-9377  9378  9379  0

c  3 does not represent an automaton state.
c    -(-b^{6, 84}_2 ∧  b^{6, 84}_1 ∧  b^{6, 84}_0 ∧ true) 
c  in CNF:
c     b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ false 
c  in DIMACS:
 9377 -9378 -9379  0
c  -3 does not represent an automaton state.
c    -( b^{6, 84}_2 ∧  b^{6, 84}_1 ∧  b^{6, 84}_0 ∧ true) 
c  in CNF:
c    -b^{6, 84}_2 ∨ -b^{6, 84}_1 ∨ -b^{6, 84}_0 ∨ false 
c  in DIMACS:
-9377 -9378 -9379  0

c i = 85
c  -2+1 --> -1
c    ( b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧  p_510) -> ( b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0)
c  in CNF:
c    -b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨  b^{6, 86}_2
c    -b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_1
c    -b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨  b^{6, 86}_0
c  in DIMACS:
-9380 -9381  9382 -510  9383 0
-9380 -9381  9382 -510 -9384 0
-9380 -9381  9382 -510  9385 0

c  -1+1 --> 0
c    ( b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0 ∧  p_510) -> (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧ -b^{6, 86}_0)
c  in CNF:
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_2
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_1
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_0
c  in DIMACS:
-9380  9381 -9382 -510 -9383 0
-9380  9381 -9382 -510 -9384 0
-9380  9381 -9382 -510 -9385 0

c  0+1 --> 1
c    (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧  p_510) -> (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0)
c  in CNF:
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_2
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_1
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨  b^{6, 86}_0
c  in DIMACS:
 9380  9381  9382 -510 -9383 0
 9380  9381  9382 -510 -9384 0
 9380  9381  9382 -510  9385 0

c  1+1 --> 2
c    (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0 ∧  p_510) -> (-b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0)
c  in CNF:
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_2
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨  b^{6, 86}_1
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ -p_510 ∨ -b^{6, 86}_0
c  in DIMACS:
 9380  9381 -9382 -510 -9383 0
 9380  9381 -9382 -510  9384 0
 9380  9381 -9382 -510 -9385 0

c  2+1 --> break 
c    (-b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧  p_510) -> break
c  in CNF:
c     b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 9380 -9381  9382 -510 1162 0


c  2-1 --> 1
c    (-b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧ -p_510) -> (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0)
c  in CNF:
c     b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_2
c     b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_1
c     b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨  b^{6, 86}_0
c  in DIMACS:
 9380 -9381  9382  510 -9383 0
 9380 -9381  9382  510 -9384 0
 9380 -9381  9382  510  9385 0

c  1-1 --> 0
c    (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0 ∧ -p_510) -> (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧ -b^{6, 86}_0)
c  in CNF:
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_2
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_1
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_0
c  in DIMACS:
 9380  9381 -9382  510 -9383 0
 9380  9381 -9382  510 -9384 0
 9380  9381 -9382  510 -9385 0

c  0-1 --> -1
c    (-b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧ -p_510) -> ( b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0)
c  in CNF:
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨  b^{6, 86}_2
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_1
c     b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨  b^{6, 86}_0
c  in DIMACS:
 9380  9381  9382  510  9383 0
 9380  9381  9382  510 -9384 0
 9380  9381  9382  510  9385 0

c  -1-1 --> -2
c    ( b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧  b^{6, 85}_0 ∧ -p_510) -> ( b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0)
c  in CNF:
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨  b^{6, 86}_2
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨  b^{6, 86}_1
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨  p_510 ∨ -b^{6, 86}_0
c  in DIMACS:
-9380  9381 -9382  510  9383 0
-9380  9381 -9382  510  9384 0
-9380  9381 -9382  510 -9385 0

c  -2-1 --> break 
c    ( b^{6, 85}_2 ∧  b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨  b^{6, 85}_0 ∨  p_510 ∨ break
c  in DIMACS:
-9380 -9381  9382  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 85}_2 ∧ -b^{6, 85}_1 ∧ -b^{6, 85}_0 ∧ true) 
c  in CNF:
c    -b^{6, 85}_2 ∨  b^{6, 85}_1 ∨  b^{6, 85}_0 ∨ false 
c  in DIMACS:
-9380  9381  9382  0

c  3 does not represent an automaton state.
c    -(-b^{6, 85}_2 ∧  b^{6, 85}_1 ∧  b^{6, 85}_0 ∧ true) 
c  in CNF:
c     b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ false 
c  in DIMACS:
 9380 -9381 -9382  0
c  -3 does not represent an automaton state.
c    -( b^{6, 85}_2 ∧  b^{6, 85}_1 ∧  b^{6, 85}_0 ∧ true) 
c  in CNF:
c    -b^{6, 85}_2 ∨ -b^{6, 85}_1 ∨ -b^{6, 85}_0 ∨ false 
c  in DIMACS:
-9380 -9381 -9382  0

c i = 86
c  -2+1 --> -1
c    ( b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧  p_516) -> ( b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0)
c  in CNF:
c    -b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨  b^{6, 87}_2
c    -b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_1
c    -b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨  b^{6, 87}_0
c  in DIMACS:
-9383 -9384  9385 -516  9386 0
-9383 -9384  9385 -516 -9387 0
-9383 -9384  9385 -516  9388 0

c  -1+1 --> 0
c    ( b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0 ∧  p_516) -> (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧ -b^{6, 87}_0)
c  in CNF:
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_2
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_1
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_0
c  in DIMACS:
-9383  9384 -9385 -516 -9386 0
-9383  9384 -9385 -516 -9387 0
-9383  9384 -9385 -516 -9388 0

c  0+1 --> 1
c    (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧  p_516) -> (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0)
c  in CNF:
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_2
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_1
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨  b^{6, 87}_0
c  in DIMACS:
 9383  9384  9385 -516 -9386 0
 9383  9384  9385 -516 -9387 0
 9383  9384  9385 -516  9388 0

c  1+1 --> 2
c    (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0 ∧  p_516) -> (-b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0)
c  in CNF:
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_2
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨  b^{6, 87}_1
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ -p_516 ∨ -b^{6, 87}_0
c  in DIMACS:
 9383  9384 -9385 -516 -9386 0
 9383  9384 -9385 -516  9387 0
 9383  9384 -9385 -516 -9388 0

c  2+1 --> break 
c    (-b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧  p_516) -> break
c  in CNF:
c     b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 9383 -9384  9385 -516 1162 0


c  2-1 --> 1
c    (-b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧ -p_516) -> (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0)
c  in CNF:
c     b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_2
c     b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_1
c     b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨  b^{6, 87}_0
c  in DIMACS:
 9383 -9384  9385  516 -9386 0
 9383 -9384  9385  516 -9387 0
 9383 -9384  9385  516  9388 0

c  1-1 --> 0
c    (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0 ∧ -p_516) -> (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧ -b^{6, 87}_0)
c  in CNF:
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_2
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_1
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_0
c  in DIMACS:
 9383  9384 -9385  516 -9386 0
 9383  9384 -9385  516 -9387 0
 9383  9384 -9385  516 -9388 0

c  0-1 --> -1
c    (-b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧ -p_516) -> ( b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0)
c  in CNF:
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨  b^{6, 87}_2
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_1
c     b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨  b^{6, 87}_0
c  in DIMACS:
 9383  9384  9385  516  9386 0
 9383  9384  9385  516 -9387 0
 9383  9384  9385  516  9388 0

c  -1-1 --> -2
c    ( b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧  b^{6, 86}_0 ∧ -p_516) -> ( b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0)
c  in CNF:
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨  b^{6, 87}_2
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨  b^{6, 87}_1
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨  p_516 ∨ -b^{6, 87}_0
c  in DIMACS:
-9383  9384 -9385  516  9386 0
-9383  9384 -9385  516  9387 0
-9383  9384 -9385  516 -9388 0

c  -2-1 --> break 
c    ( b^{6, 86}_2 ∧  b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨  b^{6, 86}_0 ∨  p_516 ∨ break
c  in DIMACS:
-9383 -9384  9385  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 86}_2 ∧ -b^{6, 86}_1 ∧ -b^{6, 86}_0 ∧ true) 
c  in CNF:
c    -b^{6, 86}_2 ∨  b^{6, 86}_1 ∨  b^{6, 86}_0 ∨ false 
c  in DIMACS:
-9383  9384  9385  0

c  3 does not represent an automaton state.
c    -(-b^{6, 86}_2 ∧  b^{6, 86}_1 ∧  b^{6, 86}_0 ∧ true) 
c  in CNF:
c     b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ false 
c  in DIMACS:
 9383 -9384 -9385  0
c  -3 does not represent an automaton state.
c    -( b^{6, 86}_2 ∧  b^{6, 86}_1 ∧  b^{6, 86}_0 ∧ true) 
c  in CNF:
c    -b^{6, 86}_2 ∨ -b^{6, 86}_1 ∨ -b^{6, 86}_0 ∨ false 
c  in DIMACS:
-9383 -9384 -9385  0

c i = 87
c  -2+1 --> -1
c    ( b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧  p_522) -> ( b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0)
c  in CNF:
c    -b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨  b^{6, 88}_2
c    -b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_1
c    -b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨  b^{6, 88}_0
c  in DIMACS:
-9386 -9387  9388 -522  9389 0
-9386 -9387  9388 -522 -9390 0
-9386 -9387  9388 -522  9391 0

c  -1+1 --> 0
c    ( b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0 ∧  p_522) -> (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧ -b^{6, 88}_0)
c  in CNF:
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_2
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_1
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_0
c  in DIMACS:
-9386  9387 -9388 -522 -9389 0
-9386  9387 -9388 -522 -9390 0
-9386  9387 -9388 -522 -9391 0

c  0+1 --> 1
c    (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧  p_522) -> (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0)
c  in CNF:
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_2
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_1
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨  b^{6, 88}_0
c  in DIMACS:
 9386  9387  9388 -522 -9389 0
 9386  9387  9388 -522 -9390 0
 9386  9387  9388 -522  9391 0

c  1+1 --> 2
c    (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0 ∧  p_522) -> (-b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0)
c  in CNF:
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_2
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨  b^{6, 88}_1
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ -p_522 ∨ -b^{6, 88}_0
c  in DIMACS:
 9386  9387 -9388 -522 -9389 0
 9386  9387 -9388 -522  9390 0
 9386  9387 -9388 -522 -9391 0

c  2+1 --> break 
c    (-b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧  p_522) -> break
c  in CNF:
c     b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 9386 -9387  9388 -522 1162 0


c  2-1 --> 1
c    (-b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧ -p_522) -> (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0)
c  in CNF:
c     b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_2
c     b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_1
c     b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨  b^{6, 88}_0
c  in DIMACS:
 9386 -9387  9388  522 -9389 0
 9386 -9387  9388  522 -9390 0
 9386 -9387  9388  522  9391 0

c  1-1 --> 0
c    (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0 ∧ -p_522) -> (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧ -b^{6, 88}_0)
c  in CNF:
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_2
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_1
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_0
c  in DIMACS:
 9386  9387 -9388  522 -9389 0
 9386  9387 -9388  522 -9390 0
 9386  9387 -9388  522 -9391 0

c  0-1 --> -1
c    (-b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧ -p_522) -> ( b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0)
c  in CNF:
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨  b^{6, 88}_2
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_1
c     b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨  b^{6, 88}_0
c  in DIMACS:
 9386  9387  9388  522  9389 0
 9386  9387  9388  522 -9390 0
 9386  9387  9388  522  9391 0

c  -1-1 --> -2
c    ( b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧  b^{6, 87}_0 ∧ -p_522) -> ( b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0)
c  in CNF:
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨  b^{6, 88}_2
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨  b^{6, 88}_1
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨  p_522 ∨ -b^{6, 88}_0
c  in DIMACS:
-9386  9387 -9388  522  9389 0
-9386  9387 -9388  522  9390 0
-9386  9387 -9388  522 -9391 0

c  -2-1 --> break 
c    ( b^{6, 87}_2 ∧  b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨  b^{6, 87}_0 ∨  p_522 ∨ break
c  in DIMACS:
-9386 -9387  9388  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 87}_2 ∧ -b^{6, 87}_1 ∧ -b^{6, 87}_0 ∧ true) 
c  in CNF:
c    -b^{6, 87}_2 ∨  b^{6, 87}_1 ∨  b^{6, 87}_0 ∨ false 
c  in DIMACS:
-9386  9387  9388  0

c  3 does not represent an automaton state.
c    -(-b^{6, 87}_2 ∧  b^{6, 87}_1 ∧  b^{6, 87}_0 ∧ true) 
c  in CNF:
c     b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ false 
c  in DIMACS:
 9386 -9387 -9388  0
c  -3 does not represent an automaton state.
c    -( b^{6, 87}_2 ∧  b^{6, 87}_1 ∧  b^{6, 87}_0 ∧ true) 
c  in CNF:
c    -b^{6, 87}_2 ∨ -b^{6, 87}_1 ∨ -b^{6, 87}_0 ∨ false 
c  in DIMACS:
-9386 -9387 -9388  0

c i = 88
c  -2+1 --> -1
c    ( b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧  p_528) -> ( b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0)
c  in CNF:
c    -b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨  b^{6, 89}_2
c    -b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_1
c    -b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨  b^{6, 89}_0
c  in DIMACS:
-9389 -9390  9391 -528  9392 0
-9389 -9390  9391 -528 -9393 0
-9389 -9390  9391 -528  9394 0

c  -1+1 --> 0
c    ( b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0 ∧  p_528) -> (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧ -b^{6, 89}_0)
c  in CNF:
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_2
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_1
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_0
c  in DIMACS:
-9389  9390 -9391 -528 -9392 0
-9389  9390 -9391 -528 -9393 0
-9389  9390 -9391 -528 -9394 0

c  0+1 --> 1
c    (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧  p_528) -> (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0)
c  in CNF:
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_2
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_1
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨  b^{6, 89}_0
c  in DIMACS:
 9389  9390  9391 -528 -9392 0
 9389  9390  9391 -528 -9393 0
 9389  9390  9391 -528  9394 0

c  1+1 --> 2
c    (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0 ∧  p_528) -> (-b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0)
c  in CNF:
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_2
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨  b^{6, 89}_1
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ -p_528 ∨ -b^{6, 89}_0
c  in DIMACS:
 9389  9390 -9391 -528 -9392 0
 9389  9390 -9391 -528  9393 0
 9389  9390 -9391 -528 -9394 0

c  2+1 --> break 
c    (-b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧  p_528) -> break
c  in CNF:
c     b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 9389 -9390  9391 -528 1162 0


c  2-1 --> 1
c    (-b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧ -p_528) -> (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0)
c  in CNF:
c     b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_2
c     b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_1
c     b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨  b^{6, 89}_0
c  in DIMACS:
 9389 -9390  9391  528 -9392 0
 9389 -9390  9391  528 -9393 0
 9389 -9390  9391  528  9394 0

c  1-1 --> 0
c    (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0 ∧ -p_528) -> (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧ -b^{6, 89}_0)
c  in CNF:
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_2
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_1
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_0
c  in DIMACS:
 9389  9390 -9391  528 -9392 0
 9389  9390 -9391  528 -9393 0
 9389  9390 -9391  528 -9394 0

c  0-1 --> -1
c    (-b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧ -p_528) -> ( b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0)
c  in CNF:
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨  b^{6, 89}_2
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_1
c     b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨  b^{6, 89}_0
c  in DIMACS:
 9389  9390  9391  528  9392 0
 9389  9390  9391  528 -9393 0
 9389  9390  9391  528  9394 0

c  -1-1 --> -2
c    ( b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧  b^{6, 88}_0 ∧ -p_528) -> ( b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0)
c  in CNF:
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨  b^{6, 89}_2
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨  b^{6, 89}_1
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨  p_528 ∨ -b^{6, 89}_0
c  in DIMACS:
-9389  9390 -9391  528  9392 0
-9389  9390 -9391  528  9393 0
-9389  9390 -9391  528 -9394 0

c  -2-1 --> break 
c    ( b^{6, 88}_2 ∧  b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨  b^{6, 88}_0 ∨  p_528 ∨ break
c  in DIMACS:
-9389 -9390  9391  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 88}_2 ∧ -b^{6, 88}_1 ∧ -b^{6, 88}_0 ∧ true) 
c  in CNF:
c    -b^{6, 88}_2 ∨  b^{6, 88}_1 ∨  b^{6, 88}_0 ∨ false 
c  in DIMACS:
-9389  9390  9391  0

c  3 does not represent an automaton state.
c    -(-b^{6, 88}_2 ∧  b^{6, 88}_1 ∧  b^{6, 88}_0 ∧ true) 
c  in CNF:
c     b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ false 
c  in DIMACS:
 9389 -9390 -9391  0
c  -3 does not represent an automaton state.
c    -( b^{6, 88}_2 ∧  b^{6, 88}_1 ∧  b^{6, 88}_0 ∧ true) 
c  in CNF:
c    -b^{6, 88}_2 ∨ -b^{6, 88}_1 ∨ -b^{6, 88}_0 ∨ false 
c  in DIMACS:
-9389 -9390 -9391  0

c i = 89
c  -2+1 --> -1
c    ( b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧  p_534) -> ( b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0)
c  in CNF:
c    -b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨  b^{6, 90}_2
c    -b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_1
c    -b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨  b^{6, 90}_0
c  in DIMACS:
-9392 -9393  9394 -534  9395 0
-9392 -9393  9394 -534 -9396 0
-9392 -9393  9394 -534  9397 0

c  -1+1 --> 0
c    ( b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0 ∧  p_534) -> (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧ -b^{6, 90}_0)
c  in CNF:
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_2
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_1
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_0
c  in DIMACS:
-9392  9393 -9394 -534 -9395 0
-9392  9393 -9394 -534 -9396 0
-9392  9393 -9394 -534 -9397 0

c  0+1 --> 1
c    (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧  p_534) -> (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0)
c  in CNF:
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_2
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_1
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨  b^{6, 90}_0
c  in DIMACS:
 9392  9393  9394 -534 -9395 0
 9392  9393  9394 -534 -9396 0
 9392  9393  9394 -534  9397 0

c  1+1 --> 2
c    (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0 ∧  p_534) -> (-b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0)
c  in CNF:
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_2
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨  b^{6, 90}_1
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ -p_534 ∨ -b^{6, 90}_0
c  in DIMACS:
 9392  9393 -9394 -534 -9395 0
 9392  9393 -9394 -534  9396 0
 9392  9393 -9394 -534 -9397 0

c  2+1 --> break 
c    (-b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧  p_534) -> break
c  in CNF:
c     b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 9392 -9393  9394 -534 1162 0


c  2-1 --> 1
c    (-b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧ -p_534) -> (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0)
c  in CNF:
c     b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_2
c     b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_1
c     b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨  b^{6, 90}_0
c  in DIMACS:
 9392 -9393  9394  534 -9395 0
 9392 -9393  9394  534 -9396 0
 9392 -9393  9394  534  9397 0

c  1-1 --> 0
c    (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0 ∧ -p_534) -> (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧ -b^{6, 90}_0)
c  in CNF:
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_2
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_1
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_0
c  in DIMACS:
 9392  9393 -9394  534 -9395 0
 9392  9393 -9394  534 -9396 0
 9392  9393 -9394  534 -9397 0

c  0-1 --> -1
c    (-b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧ -p_534) -> ( b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0)
c  in CNF:
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨  b^{6, 90}_2
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_1
c     b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨  b^{6, 90}_0
c  in DIMACS:
 9392  9393  9394  534  9395 0
 9392  9393  9394  534 -9396 0
 9392  9393  9394  534  9397 0

c  -1-1 --> -2
c    ( b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧  b^{6, 89}_0 ∧ -p_534) -> ( b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0)
c  in CNF:
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨  b^{6, 90}_2
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨  b^{6, 90}_1
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨  p_534 ∨ -b^{6, 90}_0
c  in DIMACS:
-9392  9393 -9394  534  9395 0
-9392  9393 -9394  534  9396 0
-9392  9393 -9394  534 -9397 0

c  -2-1 --> break 
c    ( b^{6, 89}_2 ∧  b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨  b^{6, 89}_0 ∨  p_534 ∨ break
c  in DIMACS:
-9392 -9393  9394  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 89}_2 ∧ -b^{6, 89}_1 ∧ -b^{6, 89}_0 ∧ true) 
c  in CNF:
c    -b^{6, 89}_2 ∨  b^{6, 89}_1 ∨  b^{6, 89}_0 ∨ false 
c  in DIMACS:
-9392  9393  9394  0

c  3 does not represent an automaton state.
c    -(-b^{6, 89}_2 ∧  b^{6, 89}_1 ∧  b^{6, 89}_0 ∧ true) 
c  in CNF:
c     b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ false 
c  in DIMACS:
 9392 -9393 -9394  0
c  -3 does not represent an automaton state.
c    -( b^{6, 89}_2 ∧  b^{6, 89}_1 ∧  b^{6, 89}_0 ∧ true) 
c  in CNF:
c    -b^{6, 89}_2 ∨ -b^{6, 89}_1 ∨ -b^{6, 89}_0 ∨ false 
c  in DIMACS:
-9392 -9393 -9394  0

c i = 90
c  -2+1 --> -1
c    ( b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧  p_540) -> ( b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0)
c  in CNF:
c    -b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨  b^{6, 91}_2
c    -b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_1
c    -b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨  b^{6, 91}_0
c  in DIMACS:
-9395 -9396  9397 -540  9398 0
-9395 -9396  9397 -540 -9399 0
-9395 -9396  9397 -540  9400 0

c  -1+1 --> 0
c    ( b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0 ∧  p_540) -> (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧ -b^{6, 91}_0)
c  in CNF:
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_2
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_1
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_0
c  in DIMACS:
-9395  9396 -9397 -540 -9398 0
-9395  9396 -9397 -540 -9399 0
-9395  9396 -9397 -540 -9400 0

c  0+1 --> 1
c    (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧  p_540) -> (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0)
c  in CNF:
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_2
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_1
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨  b^{6, 91}_0
c  in DIMACS:
 9395  9396  9397 -540 -9398 0
 9395  9396  9397 -540 -9399 0
 9395  9396  9397 -540  9400 0

c  1+1 --> 2
c    (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0 ∧  p_540) -> (-b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0)
c  in CNF:
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_2
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨  b^{6, 91}_1
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ -p_540 ∨ -b^{6, 91}_0
c  in DIMACS:
 9395  9396 -9397 -540 -9398 0
 9395  9396 -9397 -540  9399 0
 9395  9396 -9397 -540 -9400 0

c  2+1 --> break 
c    (-b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧  p_540) -> break
c  in CNF:
c     b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 9395 -9396  9397 -540 1162 0


c  2-1 --> 1
c    (-b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧ -p_540) -> (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0)
c  in CNF:
c     b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_2
c     b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_1
c     b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨  b^{6, 91}_0
c  in DIMACS:
 9395 -9396  9397  540 -9398 0
 9395 -9396  9397  540 -9399 0
 9395 -9396  9397  540  9400 0

c  1-1 --> 0
c    (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0 ∧ -p_540) -> (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧ -b^{6, 91}_0)
c  in CNF:
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_2
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_1
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_0
c  in DIMACS:
 9395  9396 -9397  540 -9398 0
 9395  9396 -9397  540 -9399 0
 9395  9396 -9397  540 -9400 0

c  0-1 --> -1
c    (-b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧ -p_540) -> ( b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0)
c  in CNF:
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨  b^{6, 91}_2
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_1
c     b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨  b^{6, 91}_0
c  in DIMACS:
 9395  9396  9397  540  9398 0
 9395  9396  9397  540 -9399 0
 9395  9396  9397  540  9400 0

c  -1-1 --> -2
c    ( b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧  b^{6, 90}_0 ∧ -p_540) -> ( b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0)
c  in CNF:
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨  b^{6, 91}_2
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨  b^{6, 91}_1
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨  p_540 ∨ -b^{6, 91}_0
c  in DIMACS:
-9395  9396 -9397  540  9398 0
-9395  9396 -9397  540  9399 0
-9395  9396 -9397  540 -9400 0

c  -2-1 --> break 
c    ( b^{6, 90}_2 ∧  b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨  b^{6, 90}_0 ∨  p_540 ∨ break
c  in DIMACS:
-9395 -9396  9397  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 90}_2 ∧ -b^{6, 90}_1 ∧ -b^{6, 90}_0 ∧ true) 
c  in CNF:
c    -b^{6, 90}_2 ∨  b^{6, 90}_1 ∨  b^{6, 90}_0 ∨ false 
c  in DIMACS:
-9395  9396  9397  0

c  3 does not represent an automaton state.
c    -(-b^{6, 90}_2 ∧  b^{6, 90}_1 ∧  b^{6, 90}_0 ∧ true) 
c  in CNF:
c     b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ false 
c  in DIMACS:
 9395 -9396 -9397  0
c  -3 does not represent an automaton state.
c    -( b^{6, 90}_2 ∧  b^{6, 90}_1 ∧  b^{6, 90}_0 ∧ true) 
c  in CNF:
c    -b^{6, 90}_2 ∨ -b^{6, 90}_1 ∨ -b^{6, 90}_0 ∨ false 
c  in DIMACS:
-9395 -9396 -9397  0

c i = 91
c  -2+1 --> -1
c    ( b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧  p_546) -> ( b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0)
c  in CNF:
c    -b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨  b^{6, 92}_2
c    -b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_1
c    -b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨  b^{6, 92}_0
c  in DIMACS:
-9398 -9399  9400 -546  9401 0
-9398 -9399  9400 -546 -9402 0
-9398 -9399  9400 -546  9403 0

c  -1+1 --> 0
c    ( b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0 ∧  p_546) -> (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧ -b^{6, 92}_0)
c  in CNF:
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_2
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_1
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_0
c  in DIMACS:
-9398  9399 -9400 -546 -9401 0
-9398  9399 -9400 -546 -9402 0
-9398  9399 -9400 -546 -9403 0

c  0+1 --> 1
c    (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧  p_546) -> (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0)
c  in CNF:
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_2
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_1
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨  b^{6, 92}_0
c  in DIMACS:
 9398  9399  9400 -546 -9401 0
 9398  9399  9400 -546 -9402 0
 9398  9399  9400 -546  9403 0

c  1+1 --> 2
c    (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0 ∧  p_546) -> (-b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0)
c  in CNF:
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_2
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨  b^{6, 92}_1
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ -p_546 ∨ -b^{6, 92}_0
c  in DIMACS:
 9398  9399 -9400 -546 -9401 0
 9398  9399 -9400 -546  9402 0
 9398  9399 -9400 -546 -9403 0

c  2+1 --> break 
c    (-b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧  p_546) -> break
c  in CNF:
c     b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 9398 -9399  9400 -546 1162 0


c  2-1 --> 1
c    (-b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧ -p_546) -> (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0)
c  in CNF:
c     b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_2
c     b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_1
c     b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨  b^{6, 92}_0
c  in DIMACS:
 9398 -9399  9400  546 -9401 0
 9398 -9399  9400  546 -9402 0
 9398 -9399  9400  546  9403 0

c  1-1 --> 0
c    (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0 ∧ -p_546) -> (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧ -b^{6, 92}_0)
c  in CNF:
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_2
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_1
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_0
c  in DIMACS:
 9398  9399 -9400  546 -9401 0
 9398  9399 -9400  546 -9402 0
 9398  9399 -9400  546 -9403 0

c  0-1 --> -1
c    (-b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧ -p_546) -> ( b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0)
c  in CNF:
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨  b^{6, 92}_2
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_1
c     b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨  b^{6, 92}_0
c  in DIMACS:
 9398  9399  9400  546  9401 0
 9398  9399  9400  546 -9402 0
 9398  9399  9400  546  9403 0

c  -1-1 --> -2
c    ( b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧  b^{6, 91}_0 ∧ -p_546) -> ( b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0)
c  in CNF:
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨  b^{6, 92}_2
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨  b^{6, 92}_1
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨  p_546 ∨ -b^{6, 92}_0
c  in DIMACS:
-9398  9399 -9400  546  9401 0
-9398  9399 -9400  546  9402 0
-9398  9399 -9400  546 -9403 0

c  -2-1 --> break 
c    ( b^{6, 91}_2 ∧  b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨  b^{6, 91}_0 ∨  p_546 ∨ break
c  in DIMACS:
-9398 -9399  9400  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 91}_2 ∧ -b^{6, 91}_1 ∧ -b^{6, 91}_0 ∧ true) 
c  in CNF:
c    -b^{6, 91}_2 ∨  b^{6, 91}_1 ∨  b^{6, 91}_0 ∨ false 
c  in DIMACS:
-9398  9399  9400  0

c  3 does not represent an automaton state.
c    -(-b^{6, 91}_2 ∧  b^{6, 91}_1 ∧  b^{6, 91}_0 ∧ true) 
c  in CNF:
c     b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ false 
c  in DIMACS:
 9398 -9399 -9400  0
c  -3 does not represent an automaton state.
c    -( b^{6, 91}_2 ∧  b^{6, 91}_1 ∧  b^{6, 91}_0 ∧ true) 
c  in CNF:
c    -b^{6, 91}_2 ∨ -b^{6, 91}_1 ∨ -b^{6, 91}_0 ∨ false 
c  in DIMACS:
-9398 -9399 -9400  0

c i = 92
c  -2+1 --> -1
c    ( b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧  p_552) -> ( b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0)
c  in CNF:
c    -b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨  b^{6, 93}_2
c    -b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_1
c    -b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨  b^{6, 93}_0
c  in DIMACS:
-9401 -9402  9403 -552  9404 0
-9401 -9402  9403 -552 -9405 0
-9401 -9402  9403 -552  9406 0

c  -1+1 --> 0
c    ( b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0 ∧  p_552) -> (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧ -b^{6, 93}_0)
c  in CNF:
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_2
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_1
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_0
c  in DIMACS:
-9401  9402 -9403 -552 -9404 0
-9401  9402 -9403 -552 -9405 0
-9401  9402 -9403 -552 -9406 0

c  0+1 --> 1
c    (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧  p_552) -> (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0)
c  in CNF:
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_2
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_1
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨  b^{6, 93}_0
c  in DIMACS:
 9401  9402  9403 -552 -9404 0
 9401  9402  9403 -552 -9405 0
 9401  9402  9403 -552  9406 0

c  1+1 --> 2
c    (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0 ∧  p_552) -> (-b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0)
c  in CNF:
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_2
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨  b^{6, 93}_1
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ -p_552 ∨ -b^{6, 93}_0
c  in DIMACS:
 9401  9402 -9403 -552 -9404 0
 9401  9402 -9403 -552  9405 0
 9401  9402 -9403 -552 -9406 0

c  2+1 --> break 
c    (-b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧  p_552) -> break
c  in CNF:
c     b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 9401 -9402  9403 -552 1162 0


c  2-1 --> 1
c    (-b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧ -p_552) -> (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0)
c  in CNF:
c     b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_2
c     b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_1
c     b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨  b^{6, 93}_0
c  in DIMACS:
 9401 -9402  9403  552 -9404 0
 9401 -9402  9403  552 -9405 0
 9401 -9402  9403  552  9406 0

c  1-1 --> 0
c    (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0 ∧ -p_552) -> (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧ -b^{6, 93}_0)
c  in CNF:
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_2
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_1
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_0
c  in DIMACS:
 9401  9402 -9403  552 -9404 0
 9401  9402 -9403  552 -9405 0
 9401  9402 -9403  552 -9406 0

c  0-1 --> -1
c    (-b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧ -p_552) -> ( b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0)
c  in CNF:
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨  b^{6, 93}_2
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_1
c     b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨  b^{6, 93}_0
c  in DIMACS:
 9401  9402  9403  552  9404 0
 9401  9402  9403  552 -9405 0
 9401  9402  9403  552  9406 0

c  -1-1 --> -2
c    ( b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧  b^{6, 92}_0 ∧ -p_552) -> ( b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0)
c  in CNF:
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨  b^{6, 93}_2
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨  b^{6, 93}_1
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨  p_552 ∨ -b^{6, 93}_0
c  in DIMACS:
-9401  9402 -9403  552  9404 0
-9401  9402 -9403  552  9405 0
-9401  9402 -9403  552 -9406 0

c  -2-1 --> break 
c    ( b^{6, 92}_2 ∧  b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨  b^{6, 92}_0 ∨  p_552 ∨ break
c  in DIMACS:
-9401 -9402  9403  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 92}_2 ∧ -b^{6, 92}_1 ∧ -b^{6, 92}_0 ∧ true) 
c  in CNF:
c    -b^{6, 92}_2 ∨  b^{6, 92}_1 ∨  b^{6, 92}_0 ∨ false 
c  in DIMACS:
-9401  9402  9403  0

c  3 does not represent an automaton state.
c    -(-b^{6, 92}_2 ∧  b^{6, 92}_1 ∧  b^{6, 92}_0 ∧ true) 
c  in CNF:
c     b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ false 
c  in DIMACS:
 9401 -9402 -9403  0
c  -3 does not represent an automaton state.
c    -( b^{6, 92}_2 ∧  b^{6, 92}_1 ∧  b^{6, 92}_0 ∧ true) 
c  in CNF:
c    -b^{6, 92}_2 ∨ -b^{6, 92}_1 ∨ -b^{6, 92}_0 ∨ false 
c  in DIMACS:
-9401 -9402 -9403  0

c i = 93
c  -2+1 --> -1
c    ( b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧  p_558) -> ( b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0)
c  in CNF:
c    -b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨  b^{6, 94}_2
c    -b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_1
c    -b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨  b^{6, 94}_0
c  in DIMACS:
-9404 -9405  9406 -558  9407 0
-9404 -9405  9406 -558 -9408 0
-9404 -9405  9406 -558  9409 0

c  -1+1 --> 0
c    ( b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0 ∧  p_558) -> (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧ -b^{6, 94}_0)
c  in CNF:
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_2
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_1
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_0
c  in DIMACS:
-9404  9405 -9406 -558 -9407 0
-9404  9405 -9406 -558 -9408 0
-9404  9405 -9406 -558 -9409 0

c  0+1 --> 1
c    (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧  p_558) -> (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0)
c  in CNF:
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_2
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_1
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨  b^{6, 94}_0
c  in DIMACS:
 9404  9405  9406 -558 -9407 0
 9404  9405  9406 -558 -9408 0
 9404  9405  9406 -558  9409 0

c  1+1 --> 2
c    (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0 ∧  p_558) -> (-b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0)
c  in CNF:
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_2
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨  b^{6, 94}_1
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ -p_558 ∨ -b^{6, 94}_0
c  in DIMACS:
 9404  9405 -9406 -558 -9407 0
 9404  9405 -9406 -558  9408 0
 9404  9405 -9406 -558 -9409 0

c  2+1 --> break 
c    (-b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧  p_558) -> break
c  in CNF:
c     b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 9404 -9405  9406 -558 1162 0


c  2-1 --> 1
c    (-b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧ -p_558) -> (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0)
c  in CNF:
c     b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_2
c     b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_1
c     b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨  b^{6, 94}_0
c  in DIMACS:
 9404 -9405  9406  558 -9407 0
 9404 -9405  9406  558 -9408 0
 9404 -9405  9406  558  9409 0

c  1-1 --> 0
c    (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0 ∧ -p_558) -> (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧ -b^{6, 94}_0)
c  in CNF:
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_2
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_1
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_0
c  in DIMACS:
 9404  9405 -9406  558 -9407 0
 9404  9405 -9406  558 -9408 0
 9404  9405 -9406  558 -9409 0

c  0-1 --> -1
c    (-b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧ -p_558) -> ( b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0)
c  in CNF:
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨  b^{6, 94}_2
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_1
c     b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨  b^{6, 94}_0
c  in DIMACS:
 9404  9405  9406  558  9407 0
 9404  9405  9406  558 -9408 0
 9404  9405  9406  558  9409 0

c  -1-1 --> -2
c    ( b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧  b^{6, 93}_0 ∧ -p_558) -> ( b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0)
c  in CNF:
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨  b^{6, 94}_2
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨  b^{6, 94}_1
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨  p_558 ∨ -b^{6, 94}_0
c  in DIMACS:
-9404  9405 -9406  558  9407 0
-9404  9405 -9406  558  9408 0
-9404  9405 -9406  558 -9409 0

c  -2-1 --> break 
c    ( b^{6, 93}_2 ∧  b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨  b^{6, 93}_0 ∨  p_558 ∨ break
c  in DIMACS:
-9404 -9405  9406  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 93}_2 ∧ -b^{6, 93}_1 ∧ -b^{6, 93}_0 ∧ true) 
c  in CNF:
c    -b^{6, 93}_2 ∨  b^{6, 93}_1 ∨  b^{6, 93}_0 ∨ false 
c  in DIMACS:
-9404  9405  9406  0

c  3 does not represent an automaton state.
c    -(-b^{6, 93}_2 ∧  b^{6, 93}_1 ∧  b^{6, 93}_0 ∧ true) 
c  in CNF:
c     b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ false 
c  in DIMACS:
 9404 -9405 -9406  0
c  -3 does not represent an automaton state.
c    -( b^{6, 93}_2 ∧  b^{6, 93}_1 ∧  b^{6, 93}_0 ∧ true) 
c  in CNF:
c    -b^{6, 93}_2 ∨ -b^{6, 93}_1 ∨ -b^{6, 93}_0 ∨ false 
c  in DIMACS:
-9404 -9405 -9406  0

c i = 94
c  -2+1 --> -1
c    ( b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧  p_564) -> ( b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0)
c  in CNF:
c    -b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨  b^{6, 95}_2
c    -b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_1
c    -b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨  b^{6, 95}_0
c  in DIMACS:
-9407 -9408  9409 -564  9410 0
-9407 -9408  9409 -564 -9411 0
-9407 -9408  9409 -564  9412 0

c  -1+1 --> 0
c    ( b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0 ∧  p_564) -> (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧ -b^{6, 95}_0)
c  in CNF:
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_2
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_1
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_0
c  in DIMACS:
-9407  9408 -9409 -564 -9410 0
-9407  9408 -9409 -564 -9411 0
-9407  9408 -9409 -564 -9412 0

c  0+1 --> 1
c    (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧  p_564) -> (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0)
c  in CNF:
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_2
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_1
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨  b^{6, 95}_0
c  in DIMACS:
 9407  9408  9409 -564 -9410 0
 9407  9408  9409 -564 -9411 0
 9407  9408  9409 -564  9412 0

c  1+1 --> 2
c    (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0 ∧  p_564) -> (-b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0)
c  in CNF:
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_2
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨  b^{6, 95}_1
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ -p_564 ∨ -b^{6, 95}_0
c  in DIMACS:
 9407  9408 -9409 -564 -9410 0
 9407  9408 -9409 -564  9411 0
 9407  9408 -9409 -564 -9412 0

c  2+1 --> break 
c    (-b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧  p_564) -> break
c  in CNF:
c     b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 9407 -9408  9409 -564 1162 0


c  2-1 --> 1
c    (-b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧ -p_564) -> (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0)
c  in CNF:
c     b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_2
c     b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_1
c     b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨  b^{6, 95}_0
c  in DIMACS:
 9407 -9408  9409  564 -9410 0
 9407 -9408  9409  564 -9411 0
 9407 -9408  9409  564  9412 0

c  1-1 --> 0
c    (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0 ∧ -p_564) -> (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧ -b^{6, 95}_0)
c  in CNF:
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_2
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_1
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_0
c  in DIMACS:
 9407  9408 -9409  564 -9410 0
 9407  9408 -9409  564 -9411 0
 9407  9408 -9409  564 -9412 0

c  0-1 --> -1
c    (-b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧ -p_564) -> ( b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0)
c  in CNF:
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨  b^{6, 95}_2
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_1
c     b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨  b^{6, 95}_0
c  in DIMACS:
 9407  9408  9409  564  9410 0
 9407  9408  9409  564 -9411 0
 9407  9408  9409  564  9412 0

c  -1-1 --> -2
c    ( b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧  b^{6, 94}_0 ∧ -p_564) -> ( b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0)
c  in CNF:
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨  b^{6, 95}_2
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨  b^{6, 95}_1
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨  p_564 ∨ -b^{6, 95}_0
c  in DIMACS:
-9407  9408 -9409  564  9410 0
-9407  9408 -9409  564  9411 0
-9407  9408 -9409  564 -9412 0

c  -2-1 --> break 
c    ( b^{6, 94}_2 ∧  b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨  b^{6, 94}_0 ∨  p_564 ∨ break
c  in DIMACS:
-9407 -9408  9409  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 94}_2 ∧ -b^{6, 94}_1 ∧ -b^{6, 94}_0 ∧ true) 
c  in CNF:
c    -b^{6, 94}_2 ∨  b^{6, 94}_1 ∨  b^{6, 94}_0 ∨ false 
c  in DIMACS:
-9407  9408  9409  0

c  3 does not represent an automaton state.
c    -(-b^{6, 94}_2 ∧  b^{6, 94}_1 ∧  b^{6, 94}_0 ∧ true) 
c  in CNF:
c     b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ false 
c  in DIMACS:
 9407 -9408 -9409  0
c  -3 does not represent an automaton state.
c    -( b^{6, 94}_2 ∧  b^{6, 94}_1 ∧  b^{6, 94}_0 ∧ true) 
c  in CNF:
c    -b^{6, 94}_2 ∨ -b^{6, 94}_1 ∨ -b^{6, 94}_0 ∨ false 
c  in DIMACS:
-9407 -9408 -9409  0

c i = 95
c  -2+1 --> -1
c    ( b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧  p_570) -> ( b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0)
c  in CNF:
c    -b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨  b^{6, 96}_2
c    -b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_1
c    -b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨  b^{6, 96}_0
c  in DIMACS:
-9410 -9411  9412 -570  9413 0
-9410 -9411  9412 -570 -9414 0
-9410 -9411  9412 -570  9415 0

c  -1+1 --> 0
c    ( b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0 ∧  p_570) -> (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧ -b^{6, 96}_0)
c  in CNF:
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_2
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_1
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_0
c  in DIMACS:
-9410  9411 -9412 -570 -9413 0
-9410  9411 -9412 -570 -9414 0
-9410  9411 -9412 -570 -9415 0

c  0+1 --> 1
c    (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧  p_570) -> (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0)
c  in CNF:
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_2
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_1
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨  b^{6, 96}_0
c  in DIMACS:
 9410  9411  9412 -570 -9413 0
 9410  9411  9412 -570 -9414 0
 9410  9411  9412 -570  9415 0

c  1+1 --> 2
c    (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0 ∧  p_570) -> (-b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0)
c  in CNF:
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_2
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨  b^{6, 96}_1
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ -p_570 ∨ -b^{6, 96}_0
c  in DIMACS:
 9410  9411 -9412 -570 -9413 0
 9410  9411 -9412 -570  9414 0
 9410  9411 -9412 -570 -9415 0

c  2+1 --> break 
c    (-b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧  p_570) -> break
c  in CNF:
c     b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 9410 -9411  9412 -570 1162 0


c  2-1 --> 1
c    (-b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧ -p_570) -> (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0)
c  in CNF:
c     b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_2
c     b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_1
c     b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨  b^{6, 96}_0
c  in DIMACS:
 9410 -9411  9412  570 -9413 0
 9410 -9411  9412  570 -9414 0
 9410 -9411  9412  570  9415 0

c  1-1 --> 0
c    (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0 ∧ -p_570) -> (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧ -b^{6, 96}_0)
c  in CNF:
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_2
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_1
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_0
c  in DIMACS:
 9410  9411 -9412  570 -9413 0
 9410  9411 -9412  570 -9414 0
 9410  9411 -9412  570 -9415 0

c  0-1 --> -1
c    (-b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧ -p_570) -> ( b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0)
c  in CNF:
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨  b^{6, 96}_2
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_1
c     b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨  b^{6, 96}_0
c  in DIMACS:
 9410  9411  9412  570  9413 0
 9410  9411  9412  570 -9414 0
 9410  9411  9412  570  9415 0

c  -1-1 --> -2
c    ( b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧  b^{6, 95}_0 ∧ -p_570) -> ( b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0)
c  in CNF:
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨  b^{6, 96}_2
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨  b^{6, 96}_1
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨  p_570 ∨ -b^{6, 96}_0
c  in DIMACS:
-9410  9411 -9412  570  9413 0
-9410  9411 -9412  570  9414 0
-9410  9411 -9412  570 -9415 0

c  -2-1 --> break 
c    ( b^{6, 95}_2 ∧  b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨  b^{6, 95}_0 ∨  p_570 ∨ break
c  in DIMACS:
-9410 -9411  9412  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 95}_2 ∧ -b^{6, 95}_1 ∧ -b^{6, 95}_0 ∧ true) 
c  in CNF:
c    -b^{6, 95}_2 ∨  b^{6, 95}_1 ∨  b^{6, 95}_0 ∨ false 
c  in DIMACS:
-9410  9411  9412  0

c  3 does not represent an automaton state.
c    -(-b^{6, 95}_2 ∧  b^{6, 95}_1 ∧  b^{6, 95}_0 ∧ true) 
c  in CNF:
c     b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ false 
c  in DIMACS:
 9410 -9411 -9412  0
c  -3 does not represent an automaton state.
c    -( b^{6, 95}_2 ∧  b^{6, 95}_1 ∧  b^{6, 95}_0 ∧ true) 
c  in CNF:
c    -b^{6, 95}_2 ∨ -b^{6, 95}_1 ∨ -b^{6, 95}_0 ∨ false 
c  in DIMACS:
-9410 -9411 -9412  0

c i = 96
c  -2+1 --> -1
c    ( b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧  p_576) -> ( b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0)
c  in CNF:
c    -b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨  b^{6, 97}_2
c    -b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_1
c    -b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨  b^{6, 97}_0
c  in DIMACS:
-9413 -9414  9415 -576  9416 0
-9413 -9414  9415 -576 -9417 0
-9413 -9414  9415 -576  9418 0

c  -1+1 --> 0
c    ( b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0 ∧  p_576) -> (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧ -b^{6, 97}_0)
c  in CNF:
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_2
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_1
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_0
c  in DIMACS:
-9413  9414 -9415 -576 -9416 0
-9413  9414 -9415 -576 -9417 0
-9413  9414 -9415 -576 -9418 0

c  0+1 --> 1
c    (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧  p_576) -> (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0)
c  in CNF:
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_2
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_1
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨  b^{6, 97}_0
c  in DIMACS:
 9413  9414  9415 -576 -9416 0
 9413  9414  9415 -576 -9417 0
 9413  9414  9415 -576  9418 0

c  1+1 --> 2
c    (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0 ∧  p_576) -> (-b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0)
c  in CNF:
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_2
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨  b^{6, 97}_1
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ -p_576 ∨ -b^{6, 97}_0
c  in DIMACS:
 9413  9414 -9415 -576 -9416 0
 9413  9414 -9415 -576  9417 0
 9413  9414 -9415 -576 -9418 0

c  2+1 --> break 
c    (-b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧  p_576) -> break
c  in CNF:
c     b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 9413 -9414  9415 -576 1162 0


c  2-1 --> 1
c    (-b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧ -p_576) -> (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0)
c  in CNF:
c     b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_2
c     b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_1
c     b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨  b^{6, 97}_0
c  in DIMACS:
 9413 -9414  9415  576 -9416 0
 9413 -9414  9415  576 -9417 0
 9413 -9414  9415  576  9418 0

c  1-1 --> 0
c    (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0 ∧ -p_576) -> (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧ -b^{6, 97}_0)
c  in CNF:
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_2
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_1
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_0
c  in DIMACS:
 9413  9414 -9415  576 -9416 0
 9413  9414 -9415  576 -9417 0
 9413  9414 -9415  576 -9418 0

c  0-1 --> -1
c    (-b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧ -p_576) -> ( b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0)
c  in CNF:
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨  b^{6, 97}_2
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_1
c     b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨  b^{6, 97}_0
c  in DIMACS:
 9413  9414  9415  576  9416 0
 9413  9414  9415  576 -9417 0
 9413  9414  9415  576  9418 0

c  -1-1 --> -2
c    ( b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧  b^{6, 96}_0 ∧ -p_576) -> ( b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0)
c  in CNF:
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨  b^{6, 97}_2
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨  b^{6, 97}_1
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨  p_576 ∨ -b^{6, 97}_0
c  in DIMACS:
-9413  9414 -9415  576  9416 0
-9413  9414 -9415  576  9417 0
-9413  9414 -9415  576 -9418 0

c  -2-1 --> break 
c    ( b^{6, 96}_2 ∧  b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨  b^{6, 96}_0 ∨  p_576 ∨ break
c  in DIMACS:
-9413 -9414  9415  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 96}_2 ∧ -b^{6, 96}_1 ∧ -b^{6, 96}_0 ∧ true) 
c  in CNF:
c    -b^{6, 96}_2 ∨  b^{6, 96}_1 ∨  b^{6, 96}_0 ∨ false 
c  in DIMACS:
-9413  9414  9415  0

c  3 does not represent an automaton state.
c    -(-b^{6, 96}_2 ∧  b^{6, 96}_1 ∧  b^{6, 96}_0 ∧ true) 
c  in CNF:
c     b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ false 
c  in DIMACS:
 9413 -9414 -9415  0
c  -3 does not represent an automaton state.
c    -( b^{6, 96}_2 ∧  b^{6, 96}_1 ∧  b^{6, 96}_0 ∧ true) 
c  in CNF:
c    -b^{6, 96}_2 ∨ -b^{6, 96}_1 ∨ -b^{6, 96}_0 ∨ false 
c  in DIMACS:
-9413 -9414 -9415  0

c i = 97
c  -2+1 --> -1
c    ( b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧  p_582) -> ( b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0)
c  in CNF:
c    -b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨  b^{6, 98}_2
c    -b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_1
c    -b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨  b^{6, 98}_0
c  in DIMACS:
-9416 -9417  9418 -582  9419 0
-9416 -9417  9418 -582 -9420 0
-9416 -9417  9418 -582  9421 0

c  -1+1 --> 0
c    ( b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0 ∧  p_582) -> (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧ -b^{6, 98}_0)
c  in CNF:
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_2
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_1
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_0
c  in DIMACS:
-9416  9417 -9418 -582 -9419 0
-9416  9417 -9418 -582 -9420 0
-9416  9417 -9418 -582 -9421 0

c  0+1 --> 1
c    (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧  p_582) -> (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0)
c  in CNF:
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_2
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_1
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨  b^{6, 98}_0
c  in DIMACS:
 9416  9417  9418 -582 -9419 0
 9416  9417  9418 -582 -9420 0
 9416  9417  9418 -582  9421 0

c  1+1 --> 2
c    (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0 ∧  p_582) -> (-b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0)
c  in CNF:
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_2
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨  b^{6, 98}_1
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ -p_582 ∨ -b^{6, 98}_0
c  in DIMACS:
 9416  9417 -9418 -582 -9419 0
 9416  9417 -9418 -582  9420 0
 9416  9417 -9418 -582 -9421 0

c  2+1 --> break 
c    (-b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧  p_582) -> break
c  in CNF:
c     b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 9416 -9417  9418 -582 1162 0


c  2-1 --> 1
c    (-b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧ -p_582) -> (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0)
c  in CNF:
c     b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_2
c     b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_1
c     b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨  b^{6, 98}_0
c  in DIMACS:
 9416 -9417  9418  582 -9419 0
 9416 -9417  9418  582 -9420 0
 9416 -9417  9418  582  9421 0

c  1-1 --> 0
c    (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0 ∧ -p_582) -> (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧ -b^{6, 98}_0)
c  in CNF:
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_2
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_1
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_0
c  in DIMACS:
 9416  9417 -9418  582 -9419 0
 9416  9417 -9418  582 -9420 0
 9416  9417 -9418  582 -9421 0

c  0-1 --> -1
c    (-b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧ -p_582) -> ( b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0)
c  in CNF:
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨  b^{6, 98}_2
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_1
c     b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨  b^{6, 98}_0
c  in DIMACS:
 9416  9417  9418  582  9419 0
 9416  9417  9418  582 -9420 0
 9416  9417  9418  582  9421 0

c  -1-1 --> -2
c    ( b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧  b^{6, 97}_0 ∧ -p_582) -> ( b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0)
c  in CNF:
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨  b^{6, 98}_2
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨  b^{6, 98}_1
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨  p_582 ∨ -b^{6, 98}_0
c  in DIMACS:
-9416  9417 -9418  582  9419 0
-9416  9417 -9418  582  9420 0
-9416  9417 -9418  582 -9421 0

c  -2-1 --> break 
c    ( b^{6, 97}_2 ∧  b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨  b^{6, 97}_0 ∨  p_582 ∨ break
c  in DIMACS:
-9416 -9417  9418  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 97}_2 ∧ -b^{6, 97}_1 ∧ -b^{6, 97}_0 ∧ true) 
c  in CNF:
c    -b^{6, 97}_2 ∨  b^{6, 97}_1 ∨  b^{6, 97}_0 ∨ false 
c  in DIMACS:
-9416  9417  9418  0

c  3 does not represent an automaton state.
c    -(-b^{6, 97}_2 ∧  b^{6, 97}_1 ∧  b^{6, 97}_0 ∧ true) 
c  in CNF:
c     b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ false 
c  in DIMACS:
 9416 -9417 -9418  0
c  -3 does not represent an automaton state.
c    -( b^{6, 97}_2 ∧  b^{6, 97}_1 ∧  b^{6, 97}_0 ∧ true) 
c  in CNF:
c    -b^{6, 97}_2 ∨ -b^{6, 97}_1 ∨ -b^{6, 97}_0 ∨ false 
c  in DIMACS:
-9416 -9417 -9418  0

c i = 98
c  -2+1 --> -1
c    ( b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧  p_588) -> ( b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0)
c  in CNF:
c    -b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨  b^{6, 99}_2
c    -b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_1
c    -b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨  b^{6, 99}_0
c  in DIMACS:
-9419 -9420  9421 -588  9422 0
-9419 -9420  9421 -588 -9423 0
-9419 -9420  9421 -588  9424 0

c  -1+1 --> 0
c    ( b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0 ∧  p_588) -> (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧ -b^{6, 99}_0)
c  in CNF:
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_2
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_1
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_0
c  in DIMACS:
-9419  9420 -9421 -588 -9422 0
-9419  9420 -9421 -588 -9423 0
-9419  9420 -9421 -588 -9424 0

c  0+1 --> 1
c    (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧  p_588) -> (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0)
c  in CNF:
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_2
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_1
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨  b^{6, 99}_0
c  in DIMACS:
 9419  9420  9421 -588 -9422 0
 9419  9420  9421 -588 -9423 0
 9419  9420  9421 -588  9424 0

c  1+1 --> 2
c    (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0 ∧  p_588) -> (-b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0)
c  in CNF:
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_2
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨  b^{6, 99}_1
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ -p_588 ∨ -b^{6, 99}_0
c  in DIMACS:
 9419  9420 -9421 -588 -9422 0
 9419  9420 -9421 -588  9423 0
 9419  9420 -9421 -588 -9424 0

c  2+1 --> break 
c    (-b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧  p_588) -> break
c  in CNF:
c     b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 9419 -9420  9421 -588 1162 0


c  2-1 --> 1
c    (-b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧ -p_588) -> (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0)
c  in CNF:
c     b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_2
c     b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_1
c     b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨  b^{6, 99}_0
c  in DIMACS:
 9419 -9420  9421  588 -9422 0
 9419 -9420  9421  588 -9423 0
 9419 -9420  9421  588  9424 0

c  1-1 --> 0
c    (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0 ∧ -p_588) -> (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧ -b^{6, 99}_0)
c  in CNF:
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_2
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_1
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_0
c  in DIMACS:
 9419  9420 -9421  588 -9422 0
 9419  9420 -9421  588 -9423 0
 9419  9420 -9421  588 -9424 0

c  0-1 --> -1
c    (-b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧ -p_588) -> ( b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0)
c  in CNF:
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨  b^{6, 99}_2
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_1
c     b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨  b^{6, 99}_0
c  in DIMACS:
 9419  9420  9421  588  9422 0
 9419  9420  9421  588 -9423 0
 9419  9420  9421  588  9424 0

c  -1-1 --> -2
c    ( b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧  b^{6, 98}_0 ∧ -p_588) -> ( b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0)
c  in CNF:
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨  b^{6, 99}_2
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨  b^{6, 99}_1
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨  p_588 ∨ -b^{6, 99}_0
c  in DIMACS:
-9419  9420 -9421  588  9422 0
-9419  9420 -9421  588  9423 0
-9419  9420 -9421  588 -9424 0

c  -2-1 --> break 
c    ( b^{6, 98}_2 ∧  b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨  b^{6, 98}_0 ∨  p_588 ∨ break
c  in DIMACS:
-9419 -9420  9421  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 98}_2 ∧ -b^{6, 98}_1 ∧ -b^{6, 98}_0 ∧ true) 
c  in CNF:
c    -b^{6, 98}_2 ∨  b^{6, 98}_1 ∨  b^{6, 98}_0 ∨ false 
c  in DIMACS:
-9419  9420  9421  0

c  3 does not represent an automaton state.
c    -(-b^{6, 98}_2 ∧  b^{6, 98}_1 ∧  b^{6, 98}_0 ∧ true) 
c  in CNF:
c     b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ false 
c  in DIMACS:
 9419 -9420 -9421  0
c  -3 does not represent an automaton state.
c    -( b^{6, 98}_2 ∧  b^{6, 98}_1 ∧  b^{6, 98}_0 ∧ true) 
c  in CNF:
c    -b^{6, 98}_2 ∨ -b^{6, 98}_1 ∨ -b^{6, 98}_0 ∨ false 
c  in DIMACS:
-9419 -9420 -9421  0

c i = 99
c  -2+1 --> -1
c    ( b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧  p_594) -> ( b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0)
c  in CNF:
c    -b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨  b^{6, 100}_2
c    -b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_1
c    -b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨  b^{6, 100}_0
c  in DIMACS:
-9422 -9423  9424 -594  9425 0
-9422 -9423  9424 -594 -9426 0
-9422 -9423  9424 -594  9427 0

c  -1+1 --> 0
c    ( b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0 ∧  p_594) -> (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧ -b^{6, 100}_0)
c  in CNF:
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_2
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_1
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_0
c  in DIMACS:
-9422  9423 -9424 -594 -9425 0
-9422  9423 -9424 -594 -9426 0
-9422  9423 -9424 -594 -9427 0

c  0+1 --> 1
c    (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧  p_594) -> (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0)
c  in CNF:
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_2
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_1
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨  b^{6, 100}_0
c  in DIMACS:
 9422  9423  9424 -594 -9425 0
 9422  9423  9424 -594 -9426 0
 9422  9423  9424 -594  9427 0

c  1+1 --> 2
c    (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0 ∧  p_594) -> (-b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0)
c  in CNF:
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_2
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨  b^{6, 100}_1
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ -p_594 ∨ -b^{6, 100}_0
c  in DIMACS:
 9422  9423 -9424 -594 -9425 0
 9422  9423 -9424 -594  9426 0
 9422  9423 -9424 -594 -9427 0

c  2+1 --> break 
c    (-b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧  p_594) -> break
c  in CNF:
c     b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 9422 -9423  9424 -594 1162 0


c  2-1 --> 1
c    (-b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧ -p_594) -> (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0)
c  in CNF:
c     b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_2
c     b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_1
c     b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨  b^{6, 100}_0
c  in DIMACS:
 9422 -9423  9424  594 -9425 0
 9422 -9423  9424  594 -9426 0
 9422 -9423  9424  594  9427 0

c  1-1 --> 0
c    (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0 ∧ -p_594) -> (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧ -b^{6, 100}_0)
c  in CNF:
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_2
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_1
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_0
c  in DIMACS:
 9422  9423 -9424  594 -9425 0
 9422  9423 -9424  594 -9426 0
 9422  9423 -9424  594 -9427 0

c  0-1 --> -1
c    (-b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧ -p_594) -> ( b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0)
c  in CNF:
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨  b^{6, 100}_2
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_1
c     b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨  b^{6, 100}_0
c  in DIMACS:
 9422  9423  9424  594  9425 0
 9422  9423  9424  594 -9426 0
 9422  9423  9424  594  9427 0

c  -1-1 --> -2
c    ( b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧  b^{6, 99}_0 ∧ -p_594) -> ( b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0)
c  in CNF:
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨  b^{6, 100}_2
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨  b^{6, 100}_1
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨  p_594 ∨ -b^{6, 100}_0
c  in DIMACS:
-9422  9423 -9424  594  9425 0
-9422  9423 -9424  594  9426 0
-9422  9423 -9424  594 -9427 0

c  -2-1 --> break 
c    ( b^{6, 99}_2 ∧  b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨  b^{6, 99}_0 ∨  p_594 ∨ break
c  in DIMACS:
-9422 -9423  9424  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 99}_2 ∧ -b^{6, 99}_1 ∧ -b^{6, 99}_0 ∧ true) 
c  in CNF:
c    -b^{6, 99}_2 ∨  b^{6, 99}_1 ∨  b^{6, 99}_0 ∨ false 
c  in DIMACS:
-9422  9423  9424  0

c  3 does not represent an automaton state.
c    -(-b^{6, 99}_2 ∧  b^{6, 99}_1 ∧  b^{6, 99}_0 ∧ true) 
c  in CNF:
c     b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ false 
c  in DIMACS:
 9422 -9423 -9424  0
c  -3 does not represent an automaton state.
c    -( b^{6, 99}_2 ∧  b^{6, 99}_1 ∧  b^{6, 99}_0 ∧ true) 
c  in CNF:
c    -b^{6, 99}_2 ∨ -b^{6, 99}_1 ∨ -b^{6, 99}_0 ∨ false 
c  in DIMACS:
-9422 -9423 -9424  0

c i = 100
c  -2+1 --> -1
c    ( b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧  p_600) -> ( b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0)
c  in CNF:
c    -b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨  b^{6, 101}_2
c    -b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_1
c    -b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨  b^{6, 101}_0
c  in DIMACS:
-9425 -9426  9427 -600  9428 0
-9425 -9426  9427 -600 -9429 0
-9425 -9426  9427 -600  9430 0

c  -1+1 --> 0
c    ( b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0 ∧  p_600) -> (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧ -b^{6, 101}_0)
c  in CNF:
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_2
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_1
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_0
c  in DIMACS:
-9425  9426 -9427 -600 -9428 0
-9425  9426 -9427 -600 -9429 0
-9425  9426 -9427 -600 -9430 0

c  0+1 --> 1
c    (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧  p_600) -> (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0)
c  in CNF:
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_2
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_1
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨  b^{6, 101}_0
c  in DIMACS:
 9425  9426  9427 -600 -9428 0
 9425  9426  9427 -600 -9429 0
 9425  9426  9427 -600  9430 0

c  1+1 --> 2
c    (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0 ∧  p_600) -> (-b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0)
c  in CNF:
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_2
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨  b^{6, 101}_1
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ -p_600 ∨ -b^{6, 101}_0
c  in DIMACS:
 9425  9426 -9427 -600 -9428 0
 9425  9426 -9427 -600  9429 0
 9425  9426 -9427 -600 -9430 0

c  2+1 --> break 
c    (-b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧  p_600) -> break
c  in CNF:
c     b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 9425 -9426  9427 -600 1162 0


c  2-1 --> 1
c    (-b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧ -p_600) -> (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0)
c  in CNF:
c     b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_2
c     b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_1
c     b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨  b^{6, 101}_0
c  in DIMACS:
 9425 -9426  9427  600 -9428 0
 9425 -9426  9427  600 -9429 0
 9425 -9426  9427  600  9430 0

c  1-1 --> 0
c    (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0 ∧ -p_600) -> (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧ -b^{6, 101}_0)
c  in CNF:
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_2
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_1
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_0
c  in DIMACS:
 9425  9426 -9427  600 -9428 0
 9425  9426 -9427  600 -9429 0
 9425  9426 -9427  600 -9430 0

c  0-1 --> -1
c    (-b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧ -p_600) -> ( b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0)
c  in CNF:
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨  b^{6, 101}_2
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_1
c     b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨  b^{6, 101}_0
c  in DIMACS:
 9425  9426  9427  600  9428 0
 9425  9426  9427  600 -9429 0
 9425  9426  9427  600  9430 0

c  -1-1 --> -2
c    ( b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧  b^{6, 100}_0 ∧ -p_600) -> ( b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0)
c  in CNF:
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨  b^{6, 101}_2
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨  b^{6, 101}_1
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨  p_600 ∨ -b^{6, 101}_0
c  in DIMACS:
-9425  9426 -9427  600  9428 0
-9425  9426 -9427  600  9429 0
-9425  9426 -9427  600 -9430 0

c  -2-1 --> break 
c    ( b^{6, 100}_2 ∧  b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨  b^{6, 100}_0 ∨  p_600 ∨ break
c  in DIMACS:
-9425 -9426  9427  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 100}_2 ∧ -b^{6, 100}_1 ∧ -b^{6, 100}_0 ∧ true) 
c  in CNF:
c    -b^{6, 100}_2 ∨  b^{6, 100}_1 ∨  b^{6, 100}_0 ∨ false 
c  in DIMACS:
-9425  9426  9427  0

c  3 does not represent an automaton state.
c    -(-b^{6, 100}_2 ∧  b^{6, 100}_1 ∧  b^{6, 100}_0 ∧ true) 
c  in CNF:
c     b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ false 
c  in DIMACS:
 9425 -9426 -9427  0
c  -3 does not represent an automaton state.
c    -( b^{6, 100}_2 ∧  b^{6, 100}_1 ∧  b^{6, 100}_0 ∧ true) 
c  in CNF:
c    -b^{6, 100}_2 ∨ -b^{6, 100}_1 ∨ -b^{6, 100}_0 ∨ false 
c  in DIMACS:
-9425 -9426 -9427  0

c i = 101
c  -2+1 --> -1
c    ( b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧  p_606) -> ( b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0)
c  in CNF:
c    -b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨  b^{6, 102}_2
c    -b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_1
c    -b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨  b^{6, 102}_0
c  in DIMACS:
-9428 -9429  9430 -606  9431 0
-9428 -9429  9430 -606 -9432 0
-9428 -9429  9430 -606  9433 0

c  -1+1 --> 0
c    ( b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0 ∧  p_606) -> (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧ -b^{6, 102}_0)
c  in CNF:
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_2
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_1
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_0
c  in DIMACS:
-9428  9429 -9430 -606 -9431 0
-9428  9429 -9430 -606 -9432 0
-9428  9429 -9430 -606 -9433 0

c  0+1 --> 1
c    (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧  p_606) -> (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0)
c  in CNF:
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_2
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_1
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨  b^{6, 102}_0
c  in DIMACS:
 9428  9429  9430 -606 -9431 0
 9428  9429  9430 -606 -9432 0
 9428  9429  9430 -606  9433 0

c  1+1 --> 2
c    (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0 ∧  p_606) -> (-b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0)
c  in CNF:
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_2
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨  b^{6, 102}_1
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ -p_606 ∨ -b^{6, 102}_0
c  in DIMACS:
 9428  9429 -9430 -606 -9431 0
 9428  9429 -9430 -606  9432 0
 9428  9429 -9430 -606 -9433 0

c  2+1 --> break 
c    (-b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧  p_606) -> break
c  in CNF:
c     b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 9428 -9429  9430 -606 1162 0


c  2-1 --> 1
c    (-b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧ -p_606) -> (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0)
c  in CNF:
c     b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_2
c     b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_1
c     b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨  b^{6, 102}_0
c  in DIMACS:
 9428 -9429  9430  606 -9431 0
 9428 -9429  9430  606 -9432 0
 9428 -9429  9430  606  9433 0

c  1-1 --> 0
c    (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0 ∧ -p_606) -> (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧ -b^{6, 102}_0)
c  in CNF:
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_2
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_1
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_0
c  in DIMACS:
 9428  9429 -9430  606 -9431 0
 9428  9429 -9430  606 -9432 0
 9428  9429 -9430  606 -9433 0

c  0-1 --> -1
c    (-b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧ -p_606) -> ( b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0)
c  in CNF:
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨  b^{6, 102}_2
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_1
c     b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨  b^{6, 102}_0
c  in DIMACS:
 9428  9429  9430  606  9431 0
 9428  9429  9430  606 -9432 0
 9428  9429  9430  606  9433 0

c  -1-1 --> -2
c    ( b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧  b^{6, 101}_0 ∧ -p_606) -> ( b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0)
c  in CNF:
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨  b^{6, 102}_2
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨  b^{6, 102}_1
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨  p_606 ∨ -b^{6, 102}_0
c  in DIMACS:
-9428  9429 -9430  606  9431 0
-9428  9429 -9430  606  9432 0
-9428  9429 -9430  606 -9433 0

c  -2-1 --> break 
c    ( b^{6, 101}_2 ∧  b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨  b^{6, 101}_0 ∨  p_606 ∨ break
c  in DIMACS:
-9428 -9429  9430  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 101}_2 ∧ -b^{6, 101}_1 ∧ -b^{6, 101}_0 ∧ true) 
c  in CNF:
c    -b^{6, 101}_2 ∨  b^{6, 101}_1 ∨  b^{6, 101}_0 ∨ false 
c  in DIMACS:
-9428  9429  9430  0

c  3 does not represent an automaton state.
c    -(-b^{6, 101}_2 ∧  b^{6, 101}_1 ∧  b^{6, 101}_0 ∧ true) 
c  in CNF:
c     b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ false 
c  in DIMACS:
 9428 -9429 -9430  0
c  -3 does not represent an automaton state.
c    -( b^{6, 101}_2 ∧  b^{6, 101}_1 ∧  b^{6, 101}_0 ∧ true) 
c  in CNF:
c    -b^{6, 101}_2 ∨ -b^{6, 101}_1 ∨ -b^{6, 101}_0 ∨ false 
c  in DIMACS:
-9428 -9429 -9430  0

c i = 102
c  -2+1 --> -1
c    ( b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧  p_612) -> ( b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0)
c  in CNF:
c    -b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨  b^{6, 103}_2
c    -b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_1
c    -b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨  b^{6, 103}_0
c  in DIMACS:
-9431 -9432  9433 -612  9434 0
-9431 -9432  9433 -612 -9435 0
-9431 -9432  9433 -612  9436 0

c  -1+1 --> 0
c    ( b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0 ∧  p_612) -> (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧ -b^{6, 103}_0)
c  in CNF:
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_2
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_1
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_0
c  in DIMACS:
-9431  9432 -9433 -612 -9434 0
-9431  9432 -9433 -612 -9435 0
-9431  9432 -9433 -612 -9436 0

c  0+1 --> 1
c    (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧  p_612) -> (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0)
c  in CNF:
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_2
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_1
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨  b^{6, 103}_0
c  in DIMACS:
 9431  9432  9433 -612 -9434 0
 9431  9432  9433 -612 -9435 0
 9431  9432  9433 -612  9436 0

c  1+1 --> 2
c    (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0 ∧  p_612) -> (-b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0)
c  in CNF:
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_2
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨  b^{6, 103}_1
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ -p_612 ∨ -b^{6, 103}_0
c  in DIMACS:
 9431  9432 -9433 -612 -9434 0
 9431  9432 -9433 -612  9435 0
 9431  9432 -9433 -612 -9436 0

c  2+1 --> break 
c    (-b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧  p_612) -> break
c  in CNF:
c     b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 9431 -9432  9433 -612 1162 0


c  2-1 --> 1
c    (-b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧ -p_612) -> (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0)
c  in CNF:
c     b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_2
c     b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_1
c     b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨  b^{6, 103}_0
c  in DIMACS:
 9431 -9432  9433  612 -9434 0
 9431 -9432  9433  612 -9435 0
 9431 -9432  9433  612  9436 0

c  1-1 --> 0
c    (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0 ∧ -p_612) -> (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧ -b^{6, 103}_0)
c  in CNF:
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_2
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_1
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_0
c  in DIMACS:
 9431  9432 -9433  612 -9434 0
 9431  9432 -9433  612 -9435 0
 9431  9432 -9433  612 -9436 0

c  0-1 --> -1
c    (-b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧ -p_612) -> ( b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0)
c  in CNF:
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨  b^{6, 103}_2
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_1
c     b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨  b^{6, 103}_0
c  in DIMACS:
 9431  9432  9433  612  9434 0
 9431  9432  9433  612 -9435 0
 9431  9432  9433  612  9436 0

c  -1-1 --> -2
c    ( b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧  b^{6, 102}_0 ∧ -p_612) -> ( b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0)
c  in CNF:
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨  b^{6, 103}_2
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨  b^{6, 103}_1
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨  p_612 ∨ -b^{6, 103}_0
c  in DIMACS:
-9431  9432 -9433  612  9434 0
-9431  9432 -9433  612  9435 0
-9431  9432 -9433  612 -9436 0

c  -2-1 --> break 
c    ( b^{6, 102}_2 ∧  b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨  b^{6, 102}_0 ∨  p_612 ∨ break
c  in DIMACS:
-9431 -9432  9433  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 102}_2 ∧ -b^{6, 102}_1 ∧ -b^{6, 102}_0 ∧ true) 
c  in CNF:
c    -b^{6, 102}_2 ∨  b^{6, 102}_1 ∨  b^{6, 102}_0 ∨ false 
c  in DIMACS:
-9431  9432  9433  0

c  3 does not represent an automaton state.
c    -(-b^{6, 102}_2 ∧  b^{6, 102}_1 ∧  b^{6, 102}_0 ∧ true) 
c  in CNF:
c     b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ false 
c  in DIMACS:
 9431 -9432 -9433  0
c  -3 does not represent an automaton state.
c    -( b^{6, 102}_2 ∧  b^{6, 102}_1 ∧  b^{6, 102}_0 ∧ true) 
c  in CNF:
c    -b^{6, 102}_2 ∨ -b^{6, 102}_1 ∨ -b^{6, 102}_0 ∨ false 
c  in DIMACS:
-9431 -9432 -9433  0

c i = 103
c  -2+1 --> -1
c    ( b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧  p_618) -> ( b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0)
c  in CNF:
c    -b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨  b^{6, 104}_2
c    -b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_1
c    -b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨  b^{6, 104}_0
c  in DIMACS:
-9434 -9435  9436 -618  9437 0
-9434 -9435  9436 -618 -9438 0
-9434 -9435  9436 -618  9439 0

c  -1+1 --> 0
c    ( b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0 ∧  p_618) -> (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧ -b^{6, 104}_0)
c  in CNF:
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_2
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_1
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_0
c  in DIMACS:
-9434  9435 -9436 -618 -9437 0
-9434  9435 -9436 -618 -9438 0
-9434  9435 -9436 -618 -9439 0

c  0+1 --> 1
c    (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧  p_618) -> (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0)
c  in CNF:
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_2
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_1
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨  b^{6, 104}_0
c  in DIMACS:
 9434  9435  9436 -618 -9437 0
 9434  9435  9436 -618 -9438 0
 9434  9435  9436 -618  9439 0

c  1+1 --> 2
c    (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0 ∧  p_618) -> (-b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0)
c  in CNF:
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_2
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨  b^{6, 104}_1
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ -p_618 ∨ -b^{6, 104}_0
c  in DIMACS:
 9434  9435 -9436 -618 -9437 0
 9434  9435 -9436 -618  9438 0
 9434  9435 -9436 -618 -9439 0

c  2+1 --> break 
c    (-b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧  p_618) -> break
c  in CNF:
c     b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 9434 -9435  9436 -618 1162 0


c  2-1 --> 1
c    (-b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧ -p_618) -> (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0)
c  in CNF:
c     b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_2
c     b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_1
c     b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨  b^{6, 104}_0
c  in DIMACS:
 9434 -9435  9436  618 -9437 0
 9434 -9435  9436  618 -9438 0
 9434 -9435  9436  618  9439 0

c  1-1 --> 0
c    (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0 ∧ -p_618) -> (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧ -b^{6, 104}_0)
c  in CNF:
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_2
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_1
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_0
c  in DIMACS:
 9434  9435 -9436  618 -9437 0
 9434  9435 -9436  618 -9438 0
 9434  9435 -9436  618 -9439 0

c  0-1 --> -1
c    (-b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧ -p_618) -> ( b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0)
c  in CNF:
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨  b^{6, 104}_2
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_1
c     b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨  b^{6, 104}_0
c  in DIMACS:
 9434  9435  9436  618  9437 0
 9434  9435  9436  618 -9438 0
 9434  9435  9436  618  9439 0

c  -1-1 --> -2
c    ( b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧  b^{6, 103}_0 ∧ -p_618) -> ( b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0)
c  in CNF:
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨  b^{6, 104}_2
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨  b^{6, 104}_1
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨  p_618 ∨ -b^{6, 104}_0
c  in DIMACS:
-9434  9435 -9436  618  9437 0
-9434  9435 -9436  618  9438 0
-9434  9435 -9436  618 -9439 0

c  -2-1 --> break 
c    ( b^{6, 103}_2 ∧  b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨  b^{6, 103}_0 ∨  p_618 ∨ break
c  in DIMACS:
-9434 -9435  9436  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 103}_2 ∧ -b^{6, 103}_1 ∧ -b^{6, 103}_0 ∧ true) 
c  in CNF:
c    -b^{6, 103}_2 ∨  b^{6, 103}_1 ∨  b^{6, 103}_0 ∨ false 
c  in DIMACS:
-9434  9435  9436  0

c  3 does not represent an automaton state.
c    -(-b^{6, 103}_2 ∧  b^{6, 103}_1 ∧  b^{6, 103}_0 ∧ true) 
c  in CNF:
c     b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ false 
c  in DIMACS:
 9434 -9435 -9436  0
c  -3 does not represent an automaton state.
c    -( b^{6, 103}_2 ∧  b^{6, 103}_1 ∧  b^{6, 103}_0 ∧ true) 
c  in CNF:
c    -b^{6, 103}_2 ∨ -b^{6, 103}_1 ∨ -b^{6, 103}_0 ∨ false 
c  in DIMACS:
-9434 -9435 -9436  0

c i = 104
c  -2+1 --> -1
c    ( b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧  p_624) -> ( b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0)
c  in CNF:
c    -b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨  b^{6, 105}_2
c    -b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_1
c    -b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨  b^{6, 105}_0
c  in DIMACS:
-9437 -9438  9439 -624  9440 0
-9437 -9438  9439 -624 -9441 0
-9437 -9438  9439 -624  9442 0

c  -1+1 --> 0
c    ( b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0 ∧  p_624) -> (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧ -b^{6, 105}_0)
c  in CNF:
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_2
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_1
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_0
c  in DIMACS:
-9437  9438 -9439 -624 -9440 0
-9437  9438 -9439 -624 -9441 0
-9437  9438 -9439 -624 -9442 0

c  0+1 --> 1
c    (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧  p_624) -> (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0)
c  in CNF:
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_2
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_1
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨  b^{6, 105}_0
c  in DIMACS:
 9437  9438  9439 -624 -9440 0
 9437  9438  9439 -624 -9441 0
 9437  9438  9439 -624  9442 0

c  1+1 --> 2
c    (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0 ∧  p_624) -> (-b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0)
c  in CNF:
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_2
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨  b^{6, 105}_1
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ -p_624 ∨ -b^{6, 105}_0
c  in DIMACS:
 9437  9438 -9439 -624 -9440 0
 9437  9438 -9439 -624  9441 0
 9437  9438 -9439 -624 -9442 0

c  2+1 --> break 
c    (-b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧  p_624) -> break
c  in CNF:
c     b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 9437 -9438  9439 -624 1162 0


c  2-1 --> 1
c    (-b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧ -p_624) -> (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0)
c  in CNF:
c     b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_2
c     b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_1
c     b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨  b^{6, 105}_0
c  in DIMACS:
 9437 -9438  9439  624 -9440 0
 9437 -9438  9439  624 -9441 0
 9437 -9438  9439  624  9442 0

c  1-1 --> 0
c    (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0 ∧ -p_624) -> (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧ -b^{6, 105}_0)
c  in CNF:
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_2
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_1
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_0
c  in DIMACS:
 9437  9438 -9439  624 -9440 0
 9437  9438 -9439  624 -9441 0
 9437  9438 -9439  624 -9442 0

c  0-1 --> -1
c    (-b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧ -p_624) -> ( b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0)
c  in CNF:
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨  b^{6, 105}_2
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_1
c     b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨  b^{6, 105}_0
c  in DIMACS:
 9437  9438  9439  624  9440 0
 9437  9438  9439  624 -9441 0
 9437  9438  9439  624  9442 0

c  -1-1 --> -2
c    ( b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧  b^{6, 104}_0 ∧ -p_624) -> ( b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0)
c  in CNF:
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨  b^{6, 105}_2
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨  b^{6, 105}_1
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨  p_624 ∨ -b^{6, 105}_0
c  in DIMACS:
-9437  9438 -9439  624  9440 0
-9437  9438 -9439  624  9441 0
-9437  9438 -9439  624 -9442 0

c  -2-1 --> break 
c    ( b^{6, 104}_2 ∧  b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨  b^{6, 104}_0 ∨  p_624 ∨ break
c  in DIMACS:
-9437 -9438  9439  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 104}_2 ∧ -b^{6, 104}_1 ∧ -b^{6, 104}_0 ∧ true) 
c  in CNF:
c    -b^{6, 104}_2 ∨  b^{6, 104}_1 ∨  b^{6, 104}_0 ∨ false 
c  in DIMACS:
-9437  9438  9439  0

c  3 does not represent an automaton state.
c    -(-b^{6, 104}_2 ∧  b^{6, 104}_1 ∧  b^{6, 104}_0 ∧ true) 
c  in CNF:
c     b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ false 
c  in DIMACS:
 9437 -9438 -9439  0
c  -3 does not represent an automaton state.
c    -( b^{6, 104}_2 ∧  b^{6, 104}_1 ∧  b^{6, 104}_0 ∧ true) 
c  in CNF:
c    -b^{6, 104}_2 ∨ -b^{6, 104}_1 ∨ -b^{6, 104}_0 ∨ false 
c  in DIMACS:
-9437 -9438 -9439  0

c i = 105
c  -2+1 --> -1
c    ( b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧  p_630) -> ( b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0)
c  in CNF:
c    -b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨  b^{6, 106}_2
c    -b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_1
c    -b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨  b^{6, 106}_0
c  in DIMACS:
-9440 -9441  9442 -630  9443 0
-9440 -9441  9442 -630 -9444 0
-9440 -9441  9442 -630  9445 0

c  -1+1 --> 0
c    ( b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0 ∧  p_630) -> (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧ -b^{6, 106}_0)
c  in CNF:
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_2
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_1
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_0
c  in DIMACS:
-9440  9441 -9442 -630 -9443 0
-9440  9441 -9442 -630 -9444 0
-9440  9441 -9442 -630 -9445 0

c  0+1 --> 1
c    (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧  p_630) -> (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0)
c  in CNF:
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_2
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_1
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨  b^{6, 106}_0
c  in DIMACS:
 9440  9441  9442 -630 -9443 0
 9440  9441  9442 -630 -9444 0
 9440  9441  9442 -630  9445 0

c  1+1 --> 2
c    (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0 ∧  p_630) -> (-b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0)
c  in CNF:
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_2
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨  b^{6, 106}_1
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ -p_630 ∨ -b^{6, 106}_0
c  in DIMACS:
 9440  9441 -9442 -630 -9443 0
 9440  9441 -9442 -630  9444 0
 9440  9441 -9442 -630 -9445 0

c  2+1 --> break 
c    (-b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧  p_630) -> break
c  in CNF:
c     b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 9440 -9441  9442 -630 1162 0


c  2-1 --> 1
c    (-b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧ -p_630) -> (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0)
c  in CNF:
c     b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_2
c     b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_1
c     b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨  b^{6, 106}_0
c  in DIMACS:
 9440 -9441  9442  630 -9443 0
 9440 -9441  9442  630 -9444 0
 9440 -9441  9442  630  9445 0

c  1-1 --> 0
c    (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0 ∧ -p_630) -> (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧ -b^{6, 106}_0)
c  in CNF:
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_2
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_1
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_0
c  in DIMACS:
 9440  9441 -9442  630 -9443 0
 9440  9441 -9442  630 -9444 0
 9440  9441 -9442  630 -9445 0

c  0-1 --> -1
c    (-b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧ -p_630) -> ( b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0)
c  in CNF:
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨  b^{6, 106}_2
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_1
c     b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨  b^{6, 106}_0
c  in DIMACS:
 9440  9441  9442  630  9443 0
 9440  9441  9442  630 -9444 0
 9440  9441  9442  630  9445 0

c  -1-1 --> -2
c    ( b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧  b^{6, 105}_0 ∧ -p_630) -> ( b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0)
c  in CNF:
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨  b^{6, 106}_2
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨  b^{6, 106}_1
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨  p_630 ∨ -b^{6, 106}_0
c  in DIMACS:
-9440  9441 -9442  630  9443 0
-9440  9441 -9442  630  9444 0
-9440  9441 -9442  630 -9445 0

c  -2-1 --> break 
c    ( b^{6, 105}_2 ∧  b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨  b^{6, 105}_0 ∨  p_630 ∨ break
c  in DIMACS:
-9440 -9441  9442  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 105}_2 ∧ -b^{6, 105}_1 ∧ -b^{6, 105}_0 ∧ true) 
c  in CNF:
c    -b^{6, 105}_2 ∨  b^{6, 105}_1 ∨  b^{6, 105}_0 ∨ false 
c  in DIMACS:
-9440  9441  9442  0

c  3 does not represent an automaton state.
c    -(-b^{6, 105}_2 ∧  b^{6, 105}_1 ∧  b^{6, 105}_0 ∧ true) 
c  in CNF:
c     b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ false 
c  in DIMACS:
 9440 -9441 -9442  0
c  -3 does not represent an automaton state.
c    -( b^{6, 105}_2 ∧  b^{6, 105}_1 ∧  b^{6, 105}_0 ∧ true) 
c  in CNF:
c    -b^{6, 105}_2 ∨ -b^{6, 105}_1 ∨ -b^{6, 105}_0 ∨ false 
c  in DIMACS:
-9440 -9441 -9442  0

c i = 106
c  -2+1 --> -1
c    ( b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧  p_636) -> ( b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0)
c  in CNF:
c    -b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨  b^{6, 107}_2
c    -b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_1
c    -b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨  b^{6, 107}_0
c  in DIMACS:
-9443 -9444  9445 -636  9446 0
-9443 -9444  9445 -636 -9447 0
-9443 -9444  9445 -636  9448 0

c  -1+1 --> 0
c    ( b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0 ∧  p_636) -> (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧ -b^{6, 107}_0)
c  in CNF:
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_2
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_1
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_0
c  in DIMACS:
-9443  9444 -9445 -636 -9446 0
-9443  9444 -9445 -636 -9447 0
-9443  9444 -9445 -636 -9448 0

c  0+1 --> 1
c    (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧  p_636) -> (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0)
c  in CNF:
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_2
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_1
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨  b^{6, 107}_0
c  in DIMACS:
 9443  9444  9445 -636 -9446 0
 9443  9444  9445 -636 -9447 0
 9443  9444  9445 -636  9448 0

c  1+1 --> 2
c    (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0 ∧  p_636) -> (-b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0)
c  in CNF:
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_2
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨  b^{6, 107}_1
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ -p_636 ∨ -b^{6, 107}_0
c  in DIMACS:
 9443  9444 -9445 -636 -9446 0
 9443  9444 -9445 -636  9447 0
 9443  9444 -9445 -636 -9448 0

c  2+1 --> break 
c    (-b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧  p_636) -> break
c  in CNF:
c     b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 9443 -9444  9445 -636 1162 0


c  2-1 --> 1
c    (-b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧ -p_636) -> (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0)
c  in CNF:
c     b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_2
c     b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_1
c     b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨  b^{6, 107}_0
c  in DIMACS:
 9443 -9444  9445  636 -9446 0
 9443 -9444  9445  636 -9447 0
 9443 -9444  9445  636  9448 0

c  1-1 --> 0
c    (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0 ∧ -p_636) -> (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧ -b^{6, 107}_0)
c  in CNF:
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_2
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_1
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_0
c  in DIMACS:
 9443  9444 -9445  636 -9446 0
 9443  9444 -9445  636 -9447 0
 9443  9444 -9445  636 -9448 0

c  0-1 --> -1
c    (-b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧ -p_636) -> ( b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0)
c  in CNF:
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨  b^{6, 107}_2
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_1
c     b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨  b^{6, 107}_0
c  in DIMACS:
 9443  9444  9445  636  9446 0
 9443  9444  9445  636 -9447 0
 9443  9444  9445  636  9448 0

c  -1-1 --> -2
c    ( b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧  b^{6, 106}_0 ∧ -p_636) -> ( b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0)
c  in CNF:
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨  b^{6, 107}_2
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨  b^{6, 107}_1
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨  p_636 ∨ -b^{6, 107}_0
c  in DIMACS:
-9443  9444 -9445  636  9446 0
-9443  9444 -9445  636  9447 0
-9443  9444 -9445  636 -9448 0

c  -2-1 --> break 
c    ( b^{6, 106}_2 ∧  b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨  b^{6, 106}_0 ∨  p_636 ∨ break
c  in DIMACS:
-9443 -9444  9445  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 106}_2 ∧ -b^{6, 106}_1 ∧ -b^{6, 106}_0 ∧ true) 
c  in CNF:
c    -b^{6, 106}_2 ∨  b^{6, 106}_1 ∨  b^{6, 106}_0 ∨ false 
c  in DIMACS:
-9443  9444  9445  0

c  3 does not represent an automaton state.
c    -(-b^{6, 106}_2 ∧  b^{6, 106}_1 ∧  b^{6, 106}_0 ∧ true) 
c  in CNF:
c     b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ false 
c  in DIMACS:
 9443 -9444 -9445  0
c  -3 does not represent an automaton state.
c    -( b^{6, 106}_2 ∧  b^{6, 106}_1 ∧  b^{6, 106}_0 ∧ true) 
c  in CNF:
c    -b^{6, 106}_2 ∨ -b^{6, 106}_1 ∨ -b^{6, 106}_0 ∨ false 
c  in DIMACS:
-9443 -9444 -9445  0

c i = 107
c  -2+1 --> -1
c    ( b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧  p_642) -> ( b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0)
c  in CNF:
c    -b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨  b^{6, 108}_2
c    -b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_1
c    -b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨  b^{6, 108}_0
c  in DIMACS:
-9446 -9447  9448 -642  9449 0
-9446 -9447  9448 -642 -9450 0
-9446 -9447  9448 -642  9451 0

c  -1+1 --> 0
c    ( b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0 ∧  p_642) -> (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧ -b^{6, 108}_0)
c  in CNF:
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_2
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_1
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_0
c  in DIMACS:
-9446  9447 -9448 -642 -9449 0
-9446  9447 -9448 -642 -9450 0
-9446  9447 -9448 -642 -9451 0

c  0+1 --> 1
c    (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧  p_642) -> (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0)
c  in CNF:
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_2
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_1
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨  b^{6, 108}_0
c  in DIMACS:
 9446  9447  9448 -642 -9449 0
 9446  9447  9448 -642 -9450 0
 9446  9447  9448 -642  9451 0

c  1+1 --> 2
c    (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0 ∧  p_642) -> (-b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0)
c  in CNF:
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_2
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨  b^{6, 108}_1
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ -p_642 ∨ -b^{6, 108}_0
c  in DIMACS:
 9446  9447 -9448 -642 -9449 0
 9446  9447 -9448 -642  9450 0
 9446  9447 -9448 -642 -9451 0

c  2+1 --> break 
c    (-b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧  p_642) -> break
c  in CNF:
c     b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 9446 -9447  9448 -642 1162 0


c  2-1 --> 1
c    (-b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧ -p_642) -> (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0)
c  in CNF:
c     b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_2
c     b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_1
c     b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨  b^{6, 108}_0
c  in DIMACS:
 9446 -9447  9448  642 -9449 0
 9446 -9447  9448  642 -9450 0
 9446 -9447  9448  642  9451 0

c  1-1 --> 0
c    (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0 ∧ -p_642) -> (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧ -b^{6, 108}_0)
c  in CNF:
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_2
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_1
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_0
c  in DIMACS:
 9446  9447 -9448  642 -9449 0
 9446  9447 -9448  642 -9450 0
 9446  9447 -9448  642 -9451 0

c  0-1 --> -1
c    (-b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧ -p_642) -> ( b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0)
c  in CNF:
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨  b^{6, 108}_2
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_1
c     b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨  b^{6, 108}_0
c  in DIMACS:
 9446  9447  9448  642  9449 0
 9446  9447  9448  642 -9450 0
 9446  9447  9448  642  9451 0

c  -1-1 --> -2
c    ( b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧  b^{6, 107}_0 ∧ -p_642) -> ( b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0)
c  in CNF:
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨  b^{6, 108}_2
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨  b^{6, 108}_1
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨  p_642 ∨ -b^{6, 108}_0
c  in DIMACS:
-9446  9447 -9448  642  9449 0
-9446  9447 -9448  642  9450 0
-9446  9447 -9448  642 -9451 0

c  -2-1 --> break 
c    ( b^{6, 107}_2 ∧  b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨  b^{6, 107}_0 ∨  p_642 ∨ break
c  in DIMACS:
-9446 -9447  9448  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 107}_2 ∧ -b^{6, 107}_1 ∧ -b^{6, 107}_0 ∧ true) 
c  in CNF:
c    -b^{6, 107}_2 ∨  b^{6, 107}_1 ∨  b^{6, 107}_0 ∨ false 
c  in DIMACS:
-9446  9447  9448  0

c  3 does not represent an automaton state.
c    -(-b^{6, 107}_2 ∧  b^{6, 107}_1 ∧  b^{6, 107}_0 ∧ true) 
c  in CNF:
c     b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ false 
c  in DIMACS:
 9446 -9447 -9448  0
c  -3 does not represent an automaton state.
c    -( b^{6, 107}_2 ∧  b^{6, 107}_1 ∧  b^{6, 107}_0 ∧ true) 
c  in CNF:
c    -b^{6, 107}_2 ∨ -b^{6, 107}_1 ∨ -b^{6, 107}_0 ∨ false 
c  in DIMACS:
-9446 -9447 -9448  0

c i = 108
c  -2+1 --> -1
c    ( b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧  p_648) -> ( b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0)
c  in CNF:
c    -b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨  b^{6, 109}_2
c    -b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_1
c    -b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨  b^{6, 109}_0
c  in DIMACS:
-9449 -9450  9451 -648  9452 0
-9449 -9450  9451 -648 -9453 0
-9449 -9450  9451 -648  9454 0

c  -1+1 --> 0
c    ( b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0 ∧  p_648) -> (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧ -b^{6, 109}_0)
c  in CNF:
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_2
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_1
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_0
c  in DIMACS:
-9449  9450 -9451 -648 -9452 0
-9449  9450 -9451 -648 -9453 0
-9449  9450 -9451 -648 -9454 0

c  0+1 --> 1
c    (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧  p_648) -> (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0)
c  in CNF:
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_2
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_1
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨  b^{6, 109}_0
c  in DIMACS:
 9449  9450  9451 -648 -9452 0
 9449  9450  9451 -648 -9453 0
 9449  9450  9451 -648  9454 0

c  1+1 --> 2
c    (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0 ∧  p_648) -> (-b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0)
c  in CNF:
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_2
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨  b^{6, 109}_1
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ -p_648 ∨ -b^{6, 109}_0
c  in DIMACS:
 9449  9450 -9451 -648 -9452 0
 9449  9450 -9451 -648  9453 0
 9449  9450 -9451 -648 -9454 0

c  2+1 --> break 
c    (-b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧  p_648) -> break
c  in CNF:
c     b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 9449 -9450  9451 -648 1162 0


c  2-1 --> 1
c    (-b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧ -p_648) -> (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0)
c  in CNF:
c     b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_2
c     b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_1
c     b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨  b^{6, 109}_0
c  in DIMACS:
 9449 -9450  9451  648 -9452 0
 9449 -9450  9451  648 -9453 0
 9449 -9450  9451  648  9454 0

c  1-1 --> 0
c    (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0 ∧ -p_648) -> (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧ -b^{6, 109}_0)
c  in CNF:
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_2
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_1
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_0
c  in DIMACS:
 9449  9450 -9451  648 -9452 0
 9449  9450 -9451  648 -9453 0
 9449  9450 -9451  648 -9454 0

c  0-1 --> -1
c    (-b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧ -p_648) -> ( b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0)
c  in CNF:
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨  b^{6, 109}_2
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_1
c     b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨  b^{6, 109}_0
c  in DIMACS:
 9449  9450  9451  648  9452 0
 9449  9450  9451  648 -9453 0
 9449  9450  9451  648  9454 0

c  -1-1 --> -2
c    ( b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧  b^{6, 108}_0 ∧ -p_648) -> ( b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0)
c  in CNF:
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨  b^{6, 109}_2
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨  b^{6, 109}_1
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨  p_648 ∨ -b^{6, 109}_0
c  in DIMACS:
-9449  9450 -9451  648  9452 0
-9449  9450 -9451  648  9453 0
-9449  9450 -9451  648 -9454 0

c  -2-1 --> break 
c    ( b^{6, 108}_2 ∧  b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨  b^{6, 108}_0 ∨  p_648 ∨ break
c  in DIMACS:
-9449 -9450  9451  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 108}_2 ∧ -b^{6, 108}_1 ∧ -b^{6, 108}_0 ∧ true) 
c  in CNF:
c    -b^{6, 108}_2 ∨  b^{6, 108}_1 ∨  b^{6, 108}_0 ∨ false 
c  in DIMACS:
-9449  9450  9451  0

c  3 does not represent an automaton state.
c    -(-b^{6, 108}_2 ∧  b^{6, 108}_1 ∧  b^{6, 108}_0 ∧ true) 
c  in CNF:
c     b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ false 
c  in DIMACS:
 9449 -9450 -9451  0
c  -3 does not represent an automaton state.
c    -( b^{6, 108}_2 ∧  b^{6, 108}_1 ∧  b^{6, 108}_0 ∧ true) 
c  in CNF:
c    -b^{6, 108}_2 ∨ -b^{6, 108}_1 ∨ -b^{6, 108}_0 ∨ false 
c  in DIMACS:
-9449 -9450 -9451  0

c i = 109
c  -2+1 --> -1
c    ( b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧  p_654) -> ( b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0)
c  in CNF:
c    -b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨  b^{6, 110}_2
c    -b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_1
c    -b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨  b^{6, 110}_0
c  in DIMACS:
-9452 -9453  9454 -654  9455 0
-9452 -9453  9454 -654 -9456 0
-9452 -9453  9454 -654  9457 0

c  -1+1 --> 0
c    ( b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0 ∧  p_654) -> (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧ -b^{6, 110}_0)
c  in CNF:
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_2
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_1
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_0
c  in DIMACS:
-9452  9453 -9454 -654 -9455 0
-9452  9453 -9454 -654 -9456 0
-9452  9453 -9454 -654 -9457 0

c  0+1 --> 1
c    (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧  p_654) -> (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0)
c  in CNF:
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_2
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_1
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨  b^{6, 110}_0
c  in DIMACS:
 9452  9453  9454 -654 -9455 0
 9452  9453  9454 -654 -9456 0
 9452  9453  9454 -654  9457 0

c  1+1 --> 2
c    (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0 ∧  p_654) -> (-b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0)
c  in CNF:
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_2
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨  b^{6, 110}_1
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ -p_654 ∨ -b^{6, 110}_0
c  in DIMACS:
 9452  9453 -9454 -654 -9455 0
 9452  9453 -9454 -654  9456 0
 9452  9453 -9454 -654 -9457 0

c  2+1 --> break 
c    (-b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧  p_654) -> break
c  in CNF:
c     b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 9452 -9453  9454 -654 1162 0


c  2-1 --> 1
c    (-b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧ -p_654) -> (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0)
c  in CNF:
c     b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_2
c     b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_1
c     b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨  b^{6, 110}_0
c  in DIMACS:
 9452 -9453  9454  654 -9455 0
 9452 -9453  9454  654 -9456 0
 9452 -9453  9454  654  9457 0

c  1-1 --> 0
c    (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0 ∧ -p_654) -> (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧ -b^{6, 110}_0)
c  in CNF:
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_2
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_1
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_0
c  in DIMACS:
 9452  9453 -9454  654 -9455 0
 9452  9453 -9454  654 -9456 0
 9452  9453 -9454  654 -9457 0

c  0-1 --> -1
c    (-b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧ -p_654) -> ( b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0)
c  in CNF:
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨  b^{6, 110}_2
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_1
c     b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨  b^{6, 110}_0
c  in DIMACS:
 9452  9453  9454  654  9455 0
 9452  9453  9454  654 -9456 0
 9452  9453  9454  654  9457 0

c  -1-1 --> -2
c    ( b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧  b^{6, 109}_0 ∧ -p_654) -> ( b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0)
c  in CNF:
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨  b^{6, 110}_2
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨  b^{6, 110}_1
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨  p_654 ∨ -b^{6, 110}_0
c  in DIMACS:
-9452  9453 -9454  654  9455 0
-9452  9453 -9454  654  9456 0
-9452  9453 -9454  654 -9457 0

c  -2-1 --> break 
c    ( b^{6, 109}_2 ∧  b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨  b^{6, 109}_0 ∨  p_654 ∨ break
c  in DIMACS:
-9452 -9453  9454  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 109}_2 ∧ -b^{6, 109}_1 ∧ -b^{6, 109}_0 ∧ true) 
c  in CNF:
c    -b^{6, 109}_2 ∨  b^{6, 109}_1 ∨  b^{6, 109}_0 ∨ false 
c  in DIMACS:
-9452  9453  9454  0

c  3 does not represent an automaton state.
c    -(-b^{6, 109}_2 ∧  b^{6, 109}_1 ∧  b^{6, 109}_0 ∧ true) 
c  in CNF:
c     b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ false 
c  in DIMACS:
 9452 -9453 -9454  0
c  -3 does not represent an automaton state.
c    -( b^{6, 109}_2 ∧  b^{6, 109}_1 ∧  b^{6, 109}_0 ∧ true) 
c  in CNF:
c    -b^{6, 109}_2 ∨ -b^{6, 109}_1 ∨ -b^{6, 109}_0 ∨ false 
c  in DIMACS:
-9452 -9453 -9454  0

c i = 110
c  -2+1 --> -1
c    ( b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧  p_660) -> ( b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0)
c  in CNF:
c    -b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨  b^{6, 111}_2
c    -b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_1
c    -b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨  b^{6, 111}_0
c  in DIMACS:
-9455 -9456  9457 -660  9458 0
-9455 -9456  9457 -660 -9459 0
-9455 -9456  9457 -660  9460 0

c  -1+1 --> 0
c    ( b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0 ∧  p_660) -> (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧ -b^{6, 111}_0)
c  in CNF:
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_2
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_1
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_0
c  in DIMACS:
-9455  9456 -9457 -660 -9458 0
-9455  9456 -9457 -660 -9459 0
-9455  9456 -9457 -660 -9460 0

c  0+1 --> 1
c    (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧  p_660) -> (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0)
c  in CNF:
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_2
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_1
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨  b^{6, 111}_0
c  in DIMACS:
 9455  9456  9457 -660 -9458 0
 9455  9456  9457 -660 -9459 0
 9455  9456  9457 -660  9460 0

c  1+1 --> 2
c    (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0 ∧  p_660) -> (-b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0)
c  in CNF:
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_2
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨  b^{6, 111}_1
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ -p_660 ∨ -b^{6, 111}_0
c  in DIMACS:
 9455  9456 -9457 -660 -9458 0
 9455  9456 -9457 -660  9459 0
 9455  9456 -9457 -660 -9460 0

c  2+1 --> break 
c    (-b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧  p_660) -> break
c  in CNF:
c     b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 9455 -9456  9457 -660 1162 0


c  2-1 --> 1
c    (-b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧ -p_660) -> (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0)
c  in CNF:
c     b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_2
c     b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_1
c     b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨  b^{6, 111}_0
c  in DIMACS:
 9455 -9456  9457  660 -9458 0
 9455 -9456  9457  660 -9459 0
 9455 -9456  9457  660  9460 0

c  1-1 --> 0
c    (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0 ∧ -p_660) -> (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧ -b^{6, 111}_0)
c  in CNF:
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_2
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_1
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_0
c  in DIMACS:
 9455  9456 -9457  660 -9458 0
 9455  9456 -9457  660 -9459 0
 9455  9456 -9457  660 -9460 0

c  0-1 --> -1
c    (-b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧ -p_660) -> ( b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0)
c  in CNF:
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨  b^{6, 111}_2
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_1
c     b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨  b^{6, 111}_0
c  in DIMACS:
 9455  9456  9457  660  9458 0
 9455  9456  9457  660 -9459 0
 9455  9456  9457  660  9460 0

c  -1-1 --> -2
c    ( b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧  b^{6, 110}_0 ∧ -p_660) -> ( b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0)
c  in CNF:
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨  b^{6, 111}_2
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨  b^{6, 111}_1
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨  p_660 ∨ -b^{6, 111}_0
c  in DIMACS:
-9455  9456 -9457  660  9458 0
-9455  9456 -9457  660  9459 0
-9455  9456 -9457  660 -9460 0

c  -2-1 --> break 
c    ( b^{6, 110}_2 ∧  b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨  b^{6, 110}_0 ∨  p_660 ∨ break
c  in DIMACS:
-9455 -9456  9457  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 110}_2 ∧ -b^{6, 110}_1 ∧ -b^{6, 110}_0 ∧ true) 
c  in CNF:
c    -b^{6, 110}_2 ∨  b^{6, 110}_1 ∨  b^{6, 110}_0 ∨ false 
c  in DIMACS:
-9455  9456  9457  0

c  3 does not represent an automaton state.
c    -(-b^{6, 110}_2 ∧  b^{6, 110}_1 ∧  b^{6, 110}_0 ∧ true) 
c  in CNF:
c     b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ false 
c  in DIMACS:
 9455 -9456 -9457  0
c  -3 does not represent an automaton state.
c    -( b^{6, 110}_2 ∧  b^{6, 110}_1 ∧  b^{6, 110}_0 ∧ true) 
c  in CNF:
c    -b^{6, 110}_2 ∨ -b^{6, 110}_1 ∨ -b^{6, 110}_0 ∨ false 
c  in DIMACS:
-9455 -9456 -9457  0

c i = 111
c  -2+1 --> -1
c    ( b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧  p_666) -> ( b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0)
c  in CNF:
c    -b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨  b^{6, 112}_2
c    -b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_1
c    -b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨  b^{6, 112}_0
c  in DIMACS:
-9458 -9459  9460 -666  9461 0
-9458 -9459  9460 -666 -9462 0
-9458 -9459  9460 -666  9463 0

c  -1+1 --> 0
c    ( b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0 ∧  p_666) -> (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧ -b^{6, 112}_0)
c  in CNF:
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_2
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_1
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_0
c  in DIMACS:
-9458  9459 -9460 -666 -9461 0
-9458  9459 -9460 -666 -9462 0
-9458  9459 -9460 -666 -9463 0

c  0+1 --> 1
c    (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧  p_666) -> (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0)
c  in CNF:
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_2
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_1
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨  b^{6, 112}_0
c  in DIMACS:
 9458  9459  9460 -666 -9461 0
 9458  9459  9460 -666 -9462 0
 9458  9459  9460 -666  9463 0

c  1+1 --> 2
c    (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0 ∧  p_666) -> (-b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0)
c  in CNF:
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_2
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨  b^{6, 112}_1
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ -p_666 ∨ -b^{6, 112}_0
c  in DIMACS:
 9458  9459 -9460 -666 -9461 0
 9458  9459 -9460 -666  9462 0
 9458  9459 -9460 -666 -9463 0

c  2+1 --> break 
c    (-b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧  p_666) -> break
c  in CNF:
c     b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 9458 -9459  9460 -666 1162 0


c  2-1 --> 1
c    (-b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧ -p_666) -> (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0)
c  in CNF:
c     b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_2
c     b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_1
c     b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨  b^{6, 112}_0
c  in DIMACS:
 9458 -9459  9460  666 -9461 0
 9458 -9459  9460  666 -9462 0
 9458 -9459  9460  666  9463 0

c  1-1 --> 0
c    (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0 ∧ -p_666) -> (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧ -b^{6, 112}_0)
c  in CNF:
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_2
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_1
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_0
c  in DIMACS:
 9458  9459 -9460  666 -9461 0
 9458  9459 -9460  666 -9462 0
 9458  9459 -9460  666 -9463 0

c  0-1 --> -1
c    (-b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧ -p_666) -> ( b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0)
c  in CNF:
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨  b^{6, 112}_2
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_1
c     b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨  b^{6, 112}_0
c  in DIMACS:
 9458  9459  9460  666  9461 0
 9458  9459  9460  666 -9462 0
 9458  9459  9460  666  9463 0

c  -1-1 --> -2
c    ( b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧  b^{6, 111}_0 ∧ -p_666) -> ( b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0)
c  in CNF:
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨  b^{6, 112}_2
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨  b^{6, 112}_1
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨  p_666 ∨ -b^{6, 112}_0
c  in DIMACS:
-9458  9459 -9460  666  9461 0
-9458  9459 -9460  666  9462 0
-9458  9459 -9460  666 -9463 0

c  -2-1 --> break 
c    ( b^{6, 111}_2 ∧  b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨  b^{6, 111}_0 ∨  p_666 ∨ break
c  in DIMACS:
-9458 -9459  9460  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 111}_2 ∧ -b^{6, 111}_1 ∧ -b^{6, 111}_0 ∧ true) 
c  in CNF:
c    -b^{6, 111}_2 ∨  b^{6, 111}_1 ∨  b^{6, 111}_0 ∨ false 
c  in DIMACS:
-9458  9459  9460  0

c  3 does not represent an automaton state.
c    -(-b^{6, 111}_2 ∧  b^{6, 111}_1 ∧  b^{6, 111}_0 ∧ true) 
c  in CNF:
c     b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ false 
c  in DIMACS:
 9458 -9459 -9460  0
c  -3 does not represent an automaton state.
c    -( b^{6, 111}_2 ∧  b^{6, 111}_1 ∧  b^{6, 111}_0 ∧ true) 
c  in CNF:
c    -b^{6, 111}_2 ∨ -b^{6, 111}_1 ∨ -b^{6, 111}_0 ∨ false 
c  in DIMACS:
-9458 -9459 -9460  0

c i = 112
c  -2+1 --> -1
c    ( b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧  p_672) -> ( b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0)
c  in CNF:
c    -b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨  b^{6, 113}_2
c    -b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_1
c    -b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨  b^{6, 113}_0
c  in DIMACS:
-9461 -9462  9463 -672  9464 0
-9461 -9462  9463 -672 -9465 0
-9461 -9462  9463 -672  9466 0

c  -1+1 --> 0
c    ( b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0 ∧  p_672) -> (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧ -b^{6, 113}_0)
c  in CNF:
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_2
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_1
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_0
c  in DIMACS:
-9461  9462 -9463 -672 -9464 0
-9461  9462 -9463 -672 -9465 0
-9461  9462 -9463 -672 -9466 0

c  0+1 --> 1
c    (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧  p_672) -> (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0)
c  in CNF:
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_2
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_1
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨  b^{6, 113}_0
c  in DIMACS:
 9461  9462  9463 -672 -9464 0
 9461  9462  9463 -672 -9465 0
 9461  9462  9463 -672  9466 0

c  1+1 --> 2
c    (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0 ∧  p_672) -> (-b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0)
c  in CNF:
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_2
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨  b^{6, 113}_1
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ -p_672 ∨ -b^{6, 113}_0
c  in DIMACS:
 9461  9462 -9463 -672 -9464 0
 9461  9462 -9463 -672  9465 0
 9461  9462 -9463 -672 -9466 0

c  2+1 --> break 
c    (-b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧  p_672) -> break
c  in CNF:
c     b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 9461 -9462  9463 -672 1162 0


c  2-1 --> 1
c    (-b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧ -p_672) -> (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0)
c  in CNF:
c     b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_2
c     b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_1
c     b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨  b^{6, 113}_0
c  in DIMACS:
 9461 -9462  9463  672 -9464 0
 9461 -9462  9463  672 -9465 0
 9461 -9462  9463  672  9466 0

c  1-1 --> 0
c    (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0 ∧ -p_672) -> (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧ -b^{6, 113}_0)
c  in CNF:
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_2
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_1
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_0
c  in DIMACS:
 9461  9462 -9463  672 -9464 0
 9461  9462 -9463  672 -9465 0
 9461  9462 -9463  672 -9466 0

c  0-1 --> -1
c    (-b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧ -p_672) -> ( b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0)
c  in CNF:
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨  b^{6, 113}_2
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_1
c     b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨  b^{6, 113}_0
c  in DIMACS:
 9461  9462  9463  672  9464 0
 9461  9462  9463  672 -9465 0
 9461  9462  9463  672  9466 0

c  -1-1 --> -2
c    ( b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧  b^{6, 112}_0 ∧ -p_672) -> ( b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0)
c  in CNF:
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨  b^{6, 113}_2
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨  b^{6, 113}_1
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨  p_672 ∨ -b^{6, 113}_0
c  in DIMACS:
-9461  9462 -9463  672  9464 0
-9461  9462 -9463  672  9465 0
-9461  9462 -9463  672 -9466 0

c  -2-1 --> break 
c    ( b^{6, 112}_2 ∧  b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨  b^{6, 112}_0 ∨  p_672 ∨ break
c  in DIMACS:
-9461 -9462  9463  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 112}_2 ∧ -b^{6, 112}_1 ∧ -b^{6, 112}_0 ∧ true) 
c  in CNF:
c    -b^{6, 112}_2 ∨  b^{6, 112}_1 ∨  b^{6, 112}_0 ∨ false 
c  in DIMACS:
-9461  9462  9463  0

c  3 does not represent an automaton state.
c    -(-b^{6, 112}_2 ∧  b^{6, 112}_1 ∧  b^{6, 112}_0 ∧ true) 
c  in CNF:
c     b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ false 
c  in DIMACS:
 9461 -9462 -9463  0
c  -3 does not represent an automaton state.
c    -( b^{6, 112}_2 ∧  b^{6, 112}_1 ∧  b^{6, 112}_0 ∧ true) 
c  in CNF:
c    -b^{6, 112}_2 ∨ -b^{6, 112}_1 ∨ -b^{6, 112}_0 ∨ false 
c  in DIMACS:
-9461 -9462 -9463  0

c i = 113
c  -2+1 --> -1
c    ( b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧  p_678) -> ( b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0)
c  in CNF:
c    -b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨  b^{6, 114}_2
c    -b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_1
c    -b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨  b^{6, 114}_0
c  in DIMACS:
-9464 -9465  9466 -678  9467 0
-9464 -9465  9466 -678 -9468 0
-9464 -9465  9466 -678  9469 0

c  -1+1 --> 0
c    ( b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0 ∧  p_678) -> (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧ -b^{6, 114}_0)
c  in CNF:
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_2
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_1
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_0
c  in DIMACS:
-9464  9465 -9466 -678 -9467 0
-9464  9465 -9466 -678 -9468 0
-9464  9465 -9466 -678 -9469 0

c  0+1 --> 1
c    (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧  p_678) -> (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0)
c  in CNF:
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_2
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_1
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨  b^{6, 114}_0
c  in DIMACS:
 9464  9465  9466 -678 -9467 0
 9464  9465  9466 -678 -9468 0
 9464  9465  9466 -678  9469 0

c  1+1 --> 2
c    (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0 ∧  p_678) -> (-b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0)
c  in CNF:
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_2
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨  b^{6, 114}_1
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ -p_678 ∨ -b^{6, 114}_0
c  in DIMACS:
 9464  9465 -9466 -678 -9467 0
 9464  9465 -9466 -678  9468 0
 9464  9465 -9466 -678 -9469 0

c  2+1 --> break 
c    (-b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧  p_678) -> break
c  in CNF:
c     b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 9464 -9465  9466 -678 1162 0


c  2-1 --> 1
c    (-b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧ -p_678) -> (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0)
c  in CNF:
c     b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_2
c     b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_1
c     b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨  b^{6, 114}_0
c  in DIMACS:
 9464 -9465  9466  678 -9467 0
 9464 -9465  9466  678 -9468 0
 9464 -9465  9466  678  9469 0

c  1-1 --> 0
c    (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0 ∧ -p_678) -> (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧ -b^{6, 114}_0)
c  in CNF:
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_2
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_1
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_0
c  in DIMACS:
 9464  9465 -9466  678 -9467 0
 9464  9465 -9466  678 -9468 0
 9464  9465 -9466  678 -9469 0

c  0-1 --> -1
c    (-b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧ -p_678) -> ( b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0)
c  in CNF:
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨  b^{6, 114}_2
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_1
c     b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨  b^{6, 114}_0
c  in DIMACS:
 9464  9465  9466  678  9467 0
 9464  9465  9466  678 -9468 0
 9464  9465  9466  678  9469 0

c  -1-1 --> -2
c    ( b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧  b^{6, 113}_0 ∧ -p_678) -> ( b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0)
c  in CNF:
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨  b^{6, 114}_2
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨  b^{6, 114}_1
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨  p_678 ∨ -b^{6, 114}_0
c  in DIMACS:
-9464  9465 -9466  678  9467 0
-9464  9465 -9466  678  9468 0
-9464  9465 -9466  678 -9469 0

c  -2-1 --> break 
c    ( b^{6, 113}_2 ∧  b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨  b^{6, 113}_0 ∨  p_678 ∨ break
c  in DIMACS:
-9464 -9465  9466  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 113}_2 ∧ -b^{6, 113}_1 ∧ -b^{6, 113}_0 ∧ true) 
c  in CNF:
c    -b^{6, 113}_2 ∨  b^{6, 113}_1 ∨  b^{6, 113}_0 ∨ false 
c  in DIMACS:
-9464  9465  9466  0

c  3 does not represent an automaton state.
c    -(-b^{6, 113}_2 ∧  b^{6, 113}_1 ∧  b^{6, 113}_0 ∧ true) 
c  in CNF:
c     b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ false 
c  in DIMACS:
 9464 -9465 -9466  0
c  -3 does not represent an automaton state.
c    -( b^{6, 113}_2 ∧  b^{6, 113}_1 ∧  b^{6, 113}_0 ∧ true) 
c  in CNF:
c    -b^{6, 113}_2 ∨ -b^{6, 113}_1 ∨ -b^{6, 113}_0 ∨ false 
c  in DIMACS:
-9464 -9465 -9466  0

c i = 114
c  -2+1 --> -1
c    ( b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧  p_684) -> ( b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0)
c  in CNF:
c    -b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨  b^{6, 115}_2
c    -b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_1
c    -b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨  b^{6, 115}_0
c  in DIMACS:
-9467 -9468  9469 -684  9470 0
-9467 -9468  9469 -684 -9471 0
-9467 -9468  9469 -684  9472 0

c  -1+1 --> 0
c    ( b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0 ∧  p_684) -> (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧ -b^{6, 115}_0)
c  in CNF:
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_2
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_1
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_0
c  in DIMACS:
-9467  9468 -9469 -684 -9470 0
-9467  9468 -9469 -684 -9471 0
-9467  9468 -9469 -684 -9472 0

c  0+1 --> 1
c    (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧  p_684) -> (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0)
c  in CNF:
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_2
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_1
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨  b^{6, 115}_0
c  in DIMACS:
 9467  9468  9469 -684 -9470 0
 9467  9468  9469 -684 -9471 0
 9467  9468  9469 -684  9472 0

c  1+1 --> 2
c    (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0 ∧  p_684) -> (-b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0)
c  in CNF:
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_2
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨  b^{6, 115}_1
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ -p_684 ∨ -b^{6, 115}_0
c  in DIMACS:
 9467  9468 -9469 -684 -9470 0
 9467  9468 -9469 -684  9471 0
 9467  9468 -9469 -684 -9472 0

c  2+1 --> break 
c    (-b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧  p_684) -> break
c  in CNF:
c     b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 9467 -9468  9469 -684 1162 0


c  2-1 --> 1
c    (-b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧ -p_684) -> (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0)
c  in CNF:
c     b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_2
c     b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_1
c     b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨  b^{6, 115}_0
c  in DIMACS:
 9467 -9468  9469  684 -9470 0
 9467 -9468  9469  684 -9471 0
 9467 -9468  9469  684  9472 0

c  1-1 --> 0
c    (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0 ∧ -p_684) -> (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧ -b^{6, 115}_0)
c  in CNF:
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_2
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_1
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_0
c  in DIMACS:
 9467  9468 -9469  684 -9470 0
 9467  9468 -9469  684 -9471 0
 9467  9468 -9469  684 -9472 0

c  0-1 --> -1
c    (-b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧ -p_684) -> ( b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0)
c  in CNF:
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨  b^{6, 115}_2
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_1
c     b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨  b^{6, 115}_0
c  in DIMACS:
 9467  9468  9469  684  9470 0
 9467  9468  9469  684 -9471 0
 9467  9468  9469  684  9472 0

c  -1-1 --> -2
c    ( b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧  b^{6, 114}_0 ∧ -p_684) -> ( b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0)
c  in CNF:
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨  b^{6, 115}_2
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨  b^{6, 115}_1
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨  p_684 ∨ -b^{6, 115}_0
c  in DIMACS:
-9467  9468 -9469  684  9470 0
-9467  9468 -9469  684  9471 0
-9467  9468 -9469  684 -9472 0

c  -2-1 --> break 
c    ( b^{6, 114}_2 ∧  b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨  b^{6, 114}_0 ∨  p_684 ∨ break
c  in DIMACS:
-9467 -9468  9469  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 114}_2 ∧ -b^{6, 114}_1 ∧ -b^{6, 114}_0 ∧ true) 
c  in CNF:
c    -b^{6, 114}_2 ∨  b^{6, 114}_1 ∨  b^{6, 114}_0 ∨ false 
c  in DIMACS:
-9467  9468  9469  0

c  3 does not represent an automaton state.
c    -(-b^{6, 114}_2 ∧  b^{6, 114}_1 ∧  b^{6, 114}_0 ∧ true) 
c  in CNF:
c     b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ false 
c  in DIMACS:
 9467 -9468 -9469  0
c  -3 does not represent an automaton state.
c    -( b^{6, 114}_2 ∧  b^{6, 114}_1 ∧  b^{6, 114}_0 ∧ true) 
c  in CNF:
c    -b^{6, 114}_2 ∨ -b^{6, 114}_1 ∨ -b^{6, 114}_0 ∨ false 
c  in DIMACS:
-9467 -9468 -9469  0

c i = 115
c  -2+1 --> -1
c    ( b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧  p_690) -> ( b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0)
c  in CNF:
c    -b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨  b^{6, 116}_2
c    -b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_1
c    -b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨  b^{6, 116}_0
c  in DIMACS:
-9470 -9471  9472 -690  9473 0
-9470 -9471  9472 -690 -9474 0
-9470 -9471  9472 -690  9475 0

c  -1+1 --> 0
c    ( b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0 ∧  p_690) -> (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧ -b^{6, 116}_0)
c  in CNF:
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_2
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_1
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_0
c  in DIMACS:
-9470  9471 -9472 -690 -9473 0
-9470  9471 -9472 -690 -9474 0
-9470  9471 -9472 -690 -9475 0

c  0+1 --> 1
c    (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧  p_690) -> (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0)
c  in CNF:
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_2
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_1
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨  b^{6, 116}_0
c  in DIMACS:
 9470  9471  9472 -690 -9473 0
 9470  9471  9472 -690 -9474 0
 9470  9471  9472 -690  9475 0

c  1+1 --> 2
c    (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0 ∧  p_690) -> (-b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0)
c  in CNF:
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_2
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨  b^{6, 116}_1
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ -p_690 ∨ -b^{6, 116}_0
c  in DIMACS:
 9470  9471 -9472 -690 -9473 0
 9470  9471 -9472 -690  9474 0
 9470  9471 -9472 -690 -9475 0

c  2+1 --> break 
c    (-b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧  p_690) -> break
c  in CNF:
c     b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 9470 -9471  9472 -690 1162 0


c  2-1 --> 1
c    (-b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧ -p_690) -> (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0)
c  in CNF:
c     b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_2
c     b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_1
c     b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨  b^{6, 116}_0
c  in DIMACS:
 9470 -9471  9472  690 -9473 0
 9470 -9471  9472  690 -9474 0
 9470 -9471  9472  690  9475 0

c  1-1 --> 0
c    (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0 ∧ -p_690) -> (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧ -b^{6, 116}_0)
c  in CNF:
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_2
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_1
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_0
c  in DIMACS:
 9470  9471 -9472  690 -9473 0
 9470  9471 -9472  690 -9474 0
 9470  9471 -9472  690 -9475 0

c  0-1 --> -1
c    (-b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧ -p_690) -> ( b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0)
c  in CNF:
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨  b^{6, 116}_2
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_1
c     b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨  b^{6, 116}_0
c  in DIMACS:
 9470  9471  9472  690  9473 0
 9470  9471  9472  690 -9474 0
 9470  9471  9472  690  9475 0

c  -1-1 --> -2
c    ( b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧  b^{6, 115}_0 ∧ -p_690) -> ( b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0)
c  in CNF:
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨  b^{6, 116}_2
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨  b^{6, 116}_1
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨  p_690 ∨ -b^{6, 116}_0
c  in DIMACS:
-9470  9471 -9472  690  9473 0
-9470  9471 -9472  690  9474 0
-9470  9471 -9472  690 -9475 0

c  -2-1 --> break 
c    ( b^{6, 115}_2 ∧  b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨  b^{6, 115}_0 ∨  p_690 ∨ break
c  in DIMACS:
-9470 -9471  9472  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 115}_2 ∧ -b^{6, 115}_1 ∧ -b^{6, 115}_0 ∧ true) 
c  in CNF:
c    -b^{6, 115}_2 ∨  b^{6, 115}_1 ∨  b^{6, 115}_0 ∨ false 
c  in DIMACS:
-9470  9471  9472  0

c  3 does not represent an automaton state.
c    -(-b^{6, 115}_2 ∧  b^{6, 115}_1 ∧  b^{6, 115}_0 ∧ true) 
c  in CNF:
c     b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ false 
c  in DIMACS:
 9470 -9471 -9472  0
c  -3 does not represent an automaton state.
c    -( b^{6, 115}_2 ∧  b^{6, 115}_1 ∧  b^{6, 115}_0 ∧ true) 
c  in CNF:
c    -b^{6, 115}_2 ∨ -b^{6, 115}_1 ∨ -b^{6, 115}_0 ∨ false 
c  in DIMACS:
-9470 -9471 -9472  0

c i = 116
c  -2+1 --> -1
c    ( b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧  p_696) -> ( b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0)
c  in CNF:
c    -b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨  b^{6, 117}_2
c    -b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_1
c    -b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨  b^{6, 117}_0
c  in DIMACS:
-9473 -9474  9475 -696  9476 0
-9473 -9474  9475 -696 -9477 0
-9473 -9474  9475 -696  9478 0

c  -1+1 --> 0
c    ( b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0 ∧  p_696) -> (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧ -b^{6, 117}_0)
c  in CNF:
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_2
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_1
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_0
c  in DIMACS:
-9473  9474 -9475 -696 -9476 0
-9473  9474 -9475 -696 -9477 0
-9473  9474 -9475 -696 -9478 0

c  0+1 --> 1
c    (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧  p_696) -> (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0)
c  in CNF:
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_2
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_1
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨  b^{6, 117}_0
c  in DIMACS:
 9473  9474  9475 -696 -9476 0
 9473  9474  9475 -696 -9477 0
 9473  9474  9475 -696  9478 0

c  1+1 --> 2
c    (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0 ∧  p_696) -> (-b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0)
c  in CNF:
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_2
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨  b^{6, 117}_1
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ -p_696 ∨ -b^{6, 117}_0
c  in DIMACS:
 9473  9474 -9475 -696 -9476 0
 9473  9474 -9475 -696  9477 0
 9473  9474 -9475 -696 -9478 0

c  2+1 --> break 
c    (-b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧  p_696) -> break
c  in CNF:
c     b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 9473 -9474  9475 -696 1162 0


c  2-1 --> 1
c    (-b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧ -p_696) -> (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0)
c  in CNF:
c     b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_2
c     b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_1
c     b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨  b^{6, 117}_0
c  in DIMACS:
 9473 -9474  9475  696 -9476 0
 9473 -9474  9475  696 -9477 0
 9473 -9474  9475  696  9478 0

c  1-1 --> 0
c    (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0 ∧ -p_696) -> (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧ -b^{6, 117}_0)
c  in CNF:
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_2
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_1
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_0
c  in DIMACS:
 9473  9474 -9475  696 -9476 0
 9473  9474 -9475  696 -9477 0
 9473  9474 -9475  696 -9478 0

c  0-1 --> -1
c    (-b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧ -p_696) -> ( b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0)
c  in CNF:
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨  b^{6, 117}_2
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_1
c     b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨  b^{6, 117}_0
c  in DIMACS:
 9473  9474  9475  696  9476 0
 9473  9474  9475  696 -9477 0
 9473  9474  9475  696  9478 0

c  -1-1 --> -2
c    ( b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧  b^{6, 116}_0 ∧ -p_696) -> ( b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0)
c  in CNF:
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨  b^{6, 117}_2
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨  b^{6, 117}_1
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨  p_696 ∨ -b^{6, 117}_0
c  in DIMACS:
-9473  9474 -9475  696  9476 0
-9473  9474 -9475  696  9477 0
-9473  9474 -9475  696 -9478 0

c  -2-1 --> break 
c    ( b^{6, 116}_2 ∧  b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨  b^{6, 116}_0 ∨  p_696 ∨ break
c  in DIMACS:
-9473 -9474  9475  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 116}_2 ∧ -b^{6, 116}_1 ∧ -b^{6, 116}_0 ∧ true) 
c  in CNF:
c    -b^{6, 116}_2 ∨  b^{6, 116}_1 ∨  b^{6, 116}_0 ∨ false 
c  in DIMACS:
-9473  9474  9475  0

c  3 does not represent an automaton state.
c    -(-b^{6, 116}_2 ∧  b^{6, 116}_1 ∧  b^{6, 116}_0 ∧ true) 
c  in CNF:
c     b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ false 
c  in DIMACS:
 9473 -9474 -9475  0
c  -3 does not represent an automaton state.
c    -( b^{6, 116}_2 ∧  b^{6, 116}_1 ∧  b^{6, 116}_0 ∧ true) 
c  in CNF:
c    -b^{6, 116}_2 ∨ -b^{6, 116}_1 ∨ -b^{6, 116}_0 ∨ false 
c  in DIMACS:
-9473 -9474 -9475  0

c i = 117
c  -2+1 --> -1
c    ( b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧  p_702) -> ( b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0)
c  in CNF:
c    -b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨  b^{6, 118}_2
c    -b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_1
c    -b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨  b^{6, 118}_0
c  in DIMACS:
-9476 -9477  9478 -702  9479 0
-9476 -9477  9478 -702 -9480 0
-9476 -9477  9478 -702  9481 0

c  -1+1 --> 0
c    ( b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0 ∧  p_702) -> (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧ -b^{6, 118}_0)
c  in CNF:
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_2
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_1
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_0
c  in DIMACS:
-9476  9477 -9478 -702 -9479 0
-9476  9477 -9478 -702 -9480 0
-9476  9477 -9478 -702 -9481 0

c  0+1 --> 1
c    (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧  p_702) -> (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0)
c  in CNF:
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_2
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_1
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨  b^{6, 118}_0
c  in DIMACS:
 9476  9477  9478 -702 -9479 0
 9476  9477  9478 -702 -9480 0
 9476  9477  9478 -702  9481 0

c  1+1 --> 2
c    (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0 ∧  p_702) -> (-b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0)
c  in CNF:
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_2
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨  b^{6, 118}_1
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ -p_702 ∨ -b^{6, 118}_0
c  in DIMACS:
 9476  9477 -9478 -702 -9479 0
 9476  9477 -9478 -702  9480 0
 9476  9477 -9478 -702 -9481 0

c  2+1 --> break 
c    (-b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧  p_702) -> break
c  in CNF:
c     b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 9476 -9477  9478 -702 1162 0


c  2-1 --> 1
c    (-b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧ -p_702) -> (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0)
c  in CNF:
c     b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_2
c     b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_1
c     b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨  b^{6, 118}_0
c  in DIMACS:
 9476 -9477  9478  702 -9479 0
 9476 -9477  9478  702 -9480 0
 9476 -9477  9478  702  9481 0

c  1-1 --> 0
c    (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0 ∧ -p_702) -> (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧ -b^{6, 118}_0)
c  in CNF:
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_2
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_1
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_0
c  in DIMACS:
 9476  9477 -9478  702 -9479 0
 9476  9477 -9478  702 -9480 0
 9476  9477 -9478  702 -9481 0

c  0-1 --> -1
c    (-b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧ -p_702) -> ( b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0)
c  in CNF:
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨  b^{6, 118}_2
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_1
c     b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨  b^{6, 118}_0
c  in DIMACS:
 9476  9477  9478  702  9479 0
 9476  9477  9478  702 -9480 0
 9476  9477  9478  702  9481 0

c  -1-1 --> -2
c    ( b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧  b^{6, 117}_0 ∧ -p_702) -> ( b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0)
c  in CNF:
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨  b^{6, 118}_2
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨  b^{6, 118}_1
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨  p_702 ∨ -b^{6, 118}_0
c  in DIMACS:
-9476  9477 -9478  702  9479 0
-9476  9477 -9478  702  9480 0
-9476  9477 -9478  702 -9481 0

c  -2-1 --> break 
c    ( b^{6, 117}_2 ∧  b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨  b^{6, 117}_0 ∨  p_702 ∨ break
c  in DIMACS:
-9476 -9477  9478  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 117}_2 ∧ -b^{6, 117}_1 ∧ -b^{6, 117}_0 ∧ true) 
c  in CNF:
c    -b^{6, 117}_2 ∨  b^{6, 117}_1 ∨  b^{6, 117}_0 ∨ false 
c  in DIMACS:
-9476  9477  9478  0

c  3 does not represent an automaton state.
c    -(-b^{6, 117}_2 ∧  b^{6, 117}_1 ∧  b^{6, 117}_0 ∧ true) 
c  in CNF:
c     b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ false 
c  in DIMACS:
 9476 -9477 -9478  0
c  -3 does not represent an automaton state.
c    -( b^{6, 117}_2 ∧  b^{6, 117}_1 ∧  b^{6, 117}_0 ∧ true) 
c  in CNF:
c    -b^{6, 117}_2 ∨ -b^{6, 117}_1 ∨ -b^{6, 117}_0 ∨ false 
c  in DIMACS:
-9476 -9477 -9478  0

c i = 118
c  -2+1 --> -1
c    ( b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧  p_708) -> ( b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0)
c  in CNF:
c    -b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨  b^{6, 119}_2
c    -b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_1
c    -b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨  b^{6, 119}_0
c  in DIMACS:
-9479 -9480  9481 -708  9482 0
-9479 -9480  9481 -708 -9483 0
-9479 -9480  9481 -708  9484 0

c  -1+1 --> 0
c    ( b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0 ∧  p_708) -> (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧ -b^{6, 119}_0)
c  in CNF:
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_2
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_1
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_0
c  in DIMACS:
-9479  9480 -9481 -708 -9482 0
-9479  9480 -9481 -708 -9483 0
-9479  9480 -9481 -708 -9484 0

c  0+1 --> 1
c    (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧  p_708) -> (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0)
c  in CNF:
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_2
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_1
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨  b^{6, 119}_0
c  in DIMACS:
 9479  9480  9481 -708 -9482 0
 9479  9480  9481 -708 -9483 0
 9479  9480  9481 -708  9484 0

c  1+1 --> 2
c    (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0 ∧  p_708) -> (-b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0)
c  in CNF:
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_2
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨  b^{6, 119}_1
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ -p_708 ∨ -b^{6, 119}_0
c  in DIMACS:
 9479  9480 -9481 -708 -9482 0
 9479  9480 -9481 -708  9483 0
 9479  9480 -9481 -708 -9484 0

c  2+1 --> break 
c    (-b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧  p_708) -> break
c  in CNF:
c     b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 9479 -9480  9481 -708 1162 0


c  2-1 --> 1
c    (-b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧ -p_708) -> (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0)
c  in CNF:
c     b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_2
c     b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_1
c     b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨  b^{6, 119}_0
c  in DIMACS:
 9479 -9480  9481  708 -9482 0
 9479 -9480  9481  708 -9483 0
 9479 -9480  9481  708  9484 0

c  1-1 --> 0
c    (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0 ∧ -p_708) -> (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧ -b^{6, 119}_0)
c  in CNF:
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_2
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_1
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_0
c  in DIMACS:
 9479  9480 -9481  708 -9482 0
 9479  9480 -9481  708 -9483 0
 9479  9480 -9481  708 -9484 0

c  0-1 --> -1
c    (-b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧ -p_708) -> ( b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0)
c  in CNF:
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨  b^{6, 119}_2
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_1
c     b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨  b^{6, 119}_0
c  in DIMACS:
 9479  9480  9481  708  9482 0
 9479  9480  9481  708 -9483 0
 9479  9480  9481  708  9484 0

c  -1-1 --> -2
c    ( b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧  b^{6, 118}_0 ∧ -p_708) -> ( b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0)
c  in CNF:
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨  b^{6, 119}_2
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨  b^{6, 119}_1
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨  p_708 ∨ -b^{6, 119}_0
c  in DIMACS:
-9479  9480 -9481  708  9482 0
-9479  9480 -9481  708  9483 0
-9479  9480 -9481  708 -9484 0

c  -2-1 --> break 
c    ( b^{6, 118}_2 ∧  b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨  b^{6, 118}_0 ∨  p_708 ∨ break
c  in DIMACS:
-9479 -9480  9481  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 118}_2 ∧ -b^{6, 118}_1 ∧ -b^{6, 118}_0 ∧ true) 
c  in CNF:
c    -b^{6, 118}_2 ∨  b^{6, 118}_1 ∨  b^{6, 118}_0 ∨ false 
c  in DIMACS:
-9479  9480  9481  0

c  3 does not represent an automaton state.
c    -(-b^{6, 118}_2 ∧  b^{6, 118}_1 ∧  b^{6, 118}_0 ∧ true) 
c  in CNF:
c     b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ false 
c  in DIMACS:
 9479 -9480 -9481  0
c  -3 does not represent an automaton state.
c    -( b^{6, 118}_2 ∧  b^{6, 118}_1 ∧  b^{6, 118}_0 ∧ true) 
c  in CNF:
c    -b^{6, 118}_2 ∨ -b^{6, 118}_1 ∨ -b^{6, 118}_0 ∨ false 
c  in DIMACS:
-9479 -9480 -9481  0

c i = 119
c  -2+1 --> -1
c    ( b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧  p_714) -> ( b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0)
c  in CNF:
c    -b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨  b^{6, 120}_2
c    -b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_1
c    -b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨  b^{6, 120}_0
c  in DIMACS:
-9482 -9483  9484 -714  9485 0
-9482 -9483  9484 -714 -9486 0
-9482 -9483  9484 -714  9487 0

c  -1+1 --> 0
c    ( b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0 ∧  p_714) -> (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧ -b^{6, 120}_0)
c  in CNF:
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_2
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_1
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_0
c  in DIMACS:
-9482  9483 -9484 -714 -9485 0
-9482  9483 -9484 -714 -9486 0
-9482  9483 -9484 -714 -9487 0

c  0+1 --> 1
c    (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧  p_714) -> (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0)
c  in CNF:
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_2
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_1
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨  b^{6, 120}_0
c  in DIMACS:
 9482  9483  9484 -714 -9485 0
 9482  9483  9484 -714 -9486 0
 9482  9483  9484 -714  9487 0

c  1+1 --> 2
c    (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0 ∧  p_714) -> (-b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0)
c  in CNF:
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_2
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨  b^{6, 120}_1
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ -p_714 ∨ -b^{6, 120}_0
c  in DIMACS:
 9482  9483 -9484 -714 -9485 0
 9482  9483 -9484 -714  9486 0
 9482  9483 -9484 -714 -9487 0

c  2+1 --> break 
c    (-b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧  p_714) -> break
c  in CNF:
c     b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 9482 -9483  9484 -714 1162 0


c  2-1 --> 1
c    (-b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧ -p_714) -> (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0)
c  in CNF:
c     b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_2
c     b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_1
c     b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨  b^{6, 120}_0
c  in DIMACS:
 9482 -9483  9484  714 -9485 0
 9482 -9483  9484  714 -9486 0
 9482 -9483  9484  714  9487 0

c  1-1 --> 0
c    (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0 ∧ -p_714) -> (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧ -b^{6, 120}_0)
c  in CNF:
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_2
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_1
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_0
c  in DIMACS:
 9482  9483 -9484  714 -9485 0
 9482  9483 -9484  714 -9486 0
 9482  9483 -9484  714 -9487 0

c  0-1 --> -1
c    (-b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧ -p_714) -> ( b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0)
c  in CNF:
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨  b^{6, 120}_2
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_1
c     b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨  b^{6, 120}_0
c  in DIMACS:
 9482  9483  9484  714  9485 0
 9482  9483  9484  714 -9486 0
 9482  9483  9484  714  9487 0

c  -1-1 --> -2
c    ( b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧  b^{6, 119}_0 ∧ -p_714) -> ( b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0)
c  in CNF:
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨  b^{6, 120}_2
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨  b^{6, 120}_1
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨  p_714 ∨ -b^{6, 120}_0
c  in DIMACS:
-9482  9483 -9484  714  9485 0
-9482  9483 -9484  714  9486 0
-9482  9483 -9484  714 -9487 0

c  -2-1 --> break 
c    ( b^{6, 119}_2 ∧  b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨  b^{6, 119}_0 ∨  p_714 ∨ break
c  in DIMACS:
-9482 -9483  9484  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 119}_2 ∧ -b^{6, 119}_1 ∧ -b^{6, 119}_0 ∧ true) 
c  in CNF:
c    -b^{6, 119}_2 ∨  b^{6, 119}_1 ∨  b^{6, 119}_0 ∨ false 
c  in DIMACS:
-9482  9483  9484  0

c  3 does not represent an automaton state.
c    -(-b^{6, 119}_2 ∧  b^{6, 119}_1 ∧  b^{6, 119}_0 ∧ true) 
c  in CNF:
c     b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ false 
c  in DIMACS:
 9482 -9483 -9484  0
c  -3 does not represent an automaton state.
c    -( b^{6, 119}_2 ∧  b^{6, 119}_1 ∧  b^{6, 119}_0 ∧ true) 
c  in CNF:
c    -b^{6, 119}_2 ∨ -b^{6, 119}_1 ∨ -b^{6, 119}_0 ∨ false 
c  in DIMACS:
-9482 -9483 -9484  0

c i = 120
c  -2+1 --> -1
c    ( b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧  p_720) -> ( b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0)
c  in CNF:
c    -b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨  b^{6, 121}_2
c    -b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_1
c    -b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨  b^{6, 121}_0
c  in DIMACS:
-9485 -9486  9487 -720  9488 0
-9485 -9486  9487 -720 -9489 0
-9485 -9486  9487 -720  9490 0

c  -1+1 --> 0
c    ( b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0 ∧  p_720) -> (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧ -b^{6, 121}_0)
c  in CNF:
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_2
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_1
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_0
c  in DIMACS:
-9485  9486 -9487 -720 -9488 0
-9485  9486 -9487 -720 -9489 0
-9485  9486 -9487 -720 -9490 0

c  0+1 --> 1
c    (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧  p_720) -> (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0)
c  in CNF:
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_2
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_1
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨  b^{6, 121}_0
c  in DIMACS:
 9485  9486  9487 -720 -9488 0
 9485  9486  9487 -720 -9489 0
 9485  9486  9487 -720  9490 0

c  1+1 --> 2
c    (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0 ∧  p_720) -> (-b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0)
c  in CNF:
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_2
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨  b^{6, 121}_1
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ -p_720 ∨ -b^{6, 121}_0
c  in DIMACS:
 9485  9486 -9487 -720 -9488 0
 9485  9486 -9487 -720  9489 0
 9485  9486 -9487 -720 -9490 0

c  2+1 --> break 
c    (-b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧  p_720) -> break
c  in CNF:
c     b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 9485 -9486  9487 -720 1162 0


c  2-1 --> 1
c    (-b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧ -p_720) -> (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0)
c  in CNF:
c     b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_2
c     b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_1
c     b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨  b^{6, 121}_0
c  in DIMACS:
 9485 -9486  9487  720 -9488 0
 9485 -9486  9487  720 -9489 0
 9485 -9486  9487  720  9490 0

c  1-1 --> 0
c    (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0 ∧ -p_720) -> (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧ -b^{6, 121}_0)
c  in CNF:
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_2
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_1
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_0
c  in DIMACS:
 9485  9486 -9487  720 -9488 0
 9485  9486 -9487  720 -9489 0
 9485  9486 -9487  720 -9490 0

c  0-1 --> -1
c    (-b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧ -p_720) -> ( b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0)
c  in CNF:
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨  b^{6, 121}_2
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_1
c     b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨  b^{6, 121}_0
c  in DIMACS:
 9485  9486  9487  720  9488 0
 9485  9486  9487  720 -9489 0
 9485  9486  9487  720  9490 0

c  -1-1 --> -2
c    ( b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧  b^{6, 120}_0 ∧ -p_720) -> ( b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0)
c  in CNF:
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨  b^{6, 121}_2
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨  b^{6, 121}_1
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨  p_720 ∨ -b^{6, 121}_0
c  in DIMACS:
-9485  9486 -9487  720  9488 0
-9485  9486 -9487  720  9489 0
-9485  9486 -9487  720 -9490 0

c  -2-1 --> break 
c    ( b^{6, 120}_2 ∧  b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨  b^{6, 120}_0 ∨  p_720 ∨ break
c  in DIMACS:
-9485 -9486  9487  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 120}_2 ∧ -b^{6, 120}_1 ∧ -b^{6, 120}_0 ∧ true) 
c  in CNF:
c    -b^{6, 120}_2 ∨  b^{6, 120}_1 ∨  b^{6, 120}_0 ∨ false 
c  in DIMACS:
-9485  9486  9487  0

c  3 does not represent an automaton state.
c    -(-b^{6, 120}_2 ∧  b^{6, 120}_1 ∧  b^{6, 120}_0 ∧ true) 
c  in CNF:
c     b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ false 
c  in DIMACS:
 9485 -9486 -9487  0
c  -3 does not represent an automaton state.
c    -( b^{6, 120}_2 ∧  b^{6, 120}_1 ∧  b^{6, 120}_0 ∧ true) 
c  in CNF:
c    -b^{6, 120}_2 ∨ -b^{6, 120}_1 ∨ -b^{6, 120}_0 ∨ false 
c  in DIMACS:
-9485 -9486 -9487  0

c i = 121
c  -2+1 --> -1
c    ( b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧  p_726) -> ( b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0)
c  in CNF:
c    -b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨  b^{6, 122}_2
c    -b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_1
c    -b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨  b^{6, 122}_0
c  in DIMACS:
-9488 -9489  9490 -726  9491 0
-9488 -9489  9490 -726 -9492 0
-9488 -9489  9490 -726  9493 0

c  -1+1 --> 0
c    ( b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0 ∧  p_726) -> (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧ -b^{6, 122}_0)
c  in CNF:
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_2
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_1
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_0
c  in DIMACS:
-9488  9489 -9490 -726 -9491 0
-9488  9489 -9490 -726 -9492 0
-9488  9489 -9490 -726 -9493 0

c  0+1 --> 1
c    (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧  p_726) -> (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0)
c  in CNF:
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_2
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_1
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨  b^{6, 122}_0
c  in DIMACS:
 9488  9489  9490 -726 -9491 0
 9488  9489  9490 -726 -9492 0
 9488  9489  9490 -726  9493 0

c  1+1 --> 2
c    (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0 ∧  p_726) -> (-b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0)
c  in CNF:
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_2
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨  b^{6, 122}_1
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ -p_726 ∨ -b^{6, 122}_0
c  in DIMACS:
 9488  9489 -9490 -726 -9491 0
 9488  9489 -9490 -726  9492 0
 9488  9489 -9490 -726 -9493 0

c  2+1 --> break 
c    (-b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧  p_726) -> break
c  in CNF:
c     b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 9488 -9489  9490 -726 1162 0


c  2-1 --> 1
c    (-b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧ -p_726) -> (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0)
c  in CNF:
c     b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_2
c     b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_1
c     b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨  b^{6, 122}_0
c  in DIMACS:
 9488 -9489  9490  726 -9491 0
 9488 -9489  9490  726 -9492 0
 9488 -9489  9490  726  9493 0

c  1-1 --> 0
c    (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0 ∧ -p_726) -> (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧ -b^{6, 122}_0)
c  in CNF:
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_2
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_1
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_0
c  in DIMACS:
 9488  9489 -9490  726 -9491 0
 9488  9489 -9490  726 -9492 0
 9488  9489 -9490  726 -9493 0

c  0-1 --> -1
c    (-b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧ -p_726) -> ( b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0)
c  in CNF:
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨  b^{6, 122}_2
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_1
c     b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨  b^{6, 122}_0
c  in DIMACS:
 9488  9489  9490  726  9491 0
 9488  9489  9490  726 -9492 0
 9488  9489  9490  726  9493 0

c  -1-1 --> -2
c    ( b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧  b^{6, 121}_0 ∧ -p_726) -> ( b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0)
c  in CNF:
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨  b^{6, 122}_2
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨  b^{6, 122}_1
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨  p_726 ∨ -b^{6, 122}_0
c  in DIMACS:
-9488  9489 -9490  726  9491 0
-9488  9489 -9490  726  9492 0
-9488  9489 -9490  726 -9493 0

c  -2-1 --> break 
c    ( b^{6, 121}_2 ∧  b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨  b^{6, 121}_0 ∨  p_726 ∨ break
c  in DIMACS:
-9488 -9489  9490  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 121}_2 ∧ -b^{6, 121}_1 ∧ -b^{6, 121}_0 ∧ true) 
c  in CNF:
c    -b^{6, 121}_2 ∨  b^{6, 121}_1 ∨  b^{6, 121}_0 ∨ false 
c  in DIMACS:
-9488  9489  9490  0

c  3 does not represent an automaton state.
c    -(-b^{6, 121}_2 ∧  b^{6, 121}_1 ∧  b^{6, 121}_0 ∧ true) 
c  in CNF:
c     b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ false 
c  in DIMACS:
 9488 -9489 -9490  0
c  -3 does not represent an automaton state.
c    -( b^{6, 121}_2 ∧  b^{6, 121}_1 ∧  b^{6, 121}_0 ∧ true) 
c  in CNF:
c    -b^{6, 121}_2 ∨ -b^{6, 121}_1 ∨ -b^{6, 121}_0 ∨ false 
c  in DIMACS:
-9488 -9489 -9490  0

c i = 122
c  -2+1 --> -1
c    ( b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧  p_732) -> ( b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0)
c  in CNF:
c    -b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨  b^{6, 123}_2
c    -b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_1
c    -b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨  b^{6, 123}_0
c  in DIMACS:
-9491 -9492  9493 -732  9494 0
-9491 -9492  9493 -732 -9495 0
-9491 -9492  9493 -732  9496 0

c  -1+1 --> 0
c    ( b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0 ∧  p_732) -> (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧ -b^{6, 123}_0)
c  in CNF:
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_2
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_1
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_0
c  in DIMACS:
-9491  9492 -9493 -732 -9494 0
-9491  9492 -9493 -732 -9495 0
-9491  9492 -9493 -732 -9496 0

c  0+1 --> 1
c    (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧  p_732) -> (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0)
c  in CNF:
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_2
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_1
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨  b^{6, 123}_0
c  in DIMACS:
 9491  9492  9493 -732 -9494 0
 9491  9492  9493 -732 -9495 0
 9491  9492  9493 -732  9496 0

c  1+1 --> 2
c    (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0 ∧  p_732) -> (-b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0)
c  in CNF:
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_2
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨  b^{6, 123}_1
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ -p_732 ∨ -b^{6, 123}_0
c  in DIMACS:
 9491  9492 -9493 -732 -9494 0
 9491  9492 -9493 -732  9495 0
 9491  9492 -9493 -732 -9496 0

c  2+1 --> break 
c    (-b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧  p_732) -> break
c  in CNF:
c     b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 9491 -9492  9493 -732 1162 0


c  2-1 --> 1
c    (-b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧ -p_732) -> (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0)
c  in CNF:
c     b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_2
c     b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_1
c     b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨  b^{6, 123}_0
c  in DIMACS:
 9491 -9492  9493  732 -9494 0
 9491 -9492  9493  732 -9495 0
 9491 -9492  9493  732  9496 0

c  1-1 --> 0
c    (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0 ∧ -p_732) -> (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧ -b^{6, 123}_0)
c  in CNF:
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_2
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_1
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_0
c  in DIMACS:
 9491  9492 -9493  732 -9494 0
 9491  9492 -9493  732 -9495 0
 9491  9492 -9493  732 -9496 0

c  0-1 --> -1
c    (-b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧ -p_732) -> ( b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0)
c  in CNF:
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨  b^{6, 123}_2
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_1
c     b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨  b^{6, 123}_0
c  in DIMACS:
 9491  9492  9493  732  9494 0
 9491  9492  9493  732 -9495 0
 9491  9492  9493  732  9496 0

c  -1-1 --> -2
c    ( b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧  b^{6, 122}_0 ∧ -p_732) -> ( b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0)
c  in CNF:
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨  b^{6, 123}_2
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨  b^{6, 123}_1
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨  p_732 ∨ -b^{6, 123}_0
c  in DIMACS:
-9491  9492 -9493  732  9494 0
-9491  9492 -9493  732  9495 0
-9491  9492 -9493  732 -9496 0

c  -2-1 --> break 
c    ( b^{6, 122}_2 ∧  b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨  b^{6, 122}_0 ∨  p_732 ∨ break
c  in DIMACS:
-9491 -9492  9493  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 122}_2 ∧ -b^{6, 122}_1 ∧ -b^{6, 122}_0 ∧ true) 
c  in CNF:
c    -b^{6, 122}_2 ∨  b^{6, 122}_1 ∨  b^{6, 122}_0 ∨ false 
c  in DIMACS:
-9491  9492  9493  0

c  3 does not represent an automaton state.
c    -(-b^{6, 122}_2 ∧  b^{6, 122}_1 ∧  b^{6, 122}_0 ∧ true) 
c  in CNF:
c     b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ false 
c  in DIMACS:
 9491 -9492 -9493  0
c  -3 does not represent an automaton state.
c    -( b^{6, 122}_2 ∧  b^{6, 122}_1 ∧  b^{6, 122}_0 ∧ true) 
c  in CNF:
c    -b^{6, 122}_2 ∨ -b^{6, 122}_1 ∨ -b^{6, 122}_0 ∨ false 
c  in DIMACS:
-9491 -9492 -9493  0

c i = 123
c  -2+1 --> -1
c    ( b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧  p_738) -> ( b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0)
c  in CNF:
c    -b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨  b^{6, 124}_2
c    -b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_1
c    -b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨  b^{6, 124}_0
c  in DIMACS:
-9494 -9495  9496 -738  9497 0
-9494 -9495  9496 -738 -9498 0
-9494 -9495  9496 -738  9499 0

c  -1+1 --> 0
c    ( b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0 ∧  p_738) -> (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧ -b^{6, 124}_0)
c  in CNF:
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_2
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_1
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_0
c  in DIMACS:
-9494  9495 -9496 -738 -9497 0
-9494  9495 -9496 -738 -9498 0
-9494  9495 -9496 -738 -9499 0

c  0+1 --> 1
c    (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧  p_738) -> (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0)
c  in CNF:
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_2
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_1
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨  b^{6, 124}_0
c  in DIMACS:
 9494  9495  9496 -738 -9497 0
 9494  9495  9496 -738 -9498 0
 9494  9495  9496 -738  9499 0

c  1+1 --> 2
c    (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0 ∧  p_738) -> (-b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0)
c  in CNF:
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_2
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨  b^{6, 124}_1
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ -p_738 ∨ -b^{6, 124}_0
c  in DIMACS:
 9494  9495 -9496 -738 -9497 0
 9494  9495 -9496 -738  9498 0
 9494  9495 -9496 -738 -9499 0

c  2+1 --> break 
c    (-b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧  p_738) -> break
c  in CNF:
c     b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 9494 -9495  9496 -738 1162 0


c  2-1 --> 1
c    (-b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧ -p_738) -> (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0)
c  in CNF:
c     b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_2
c     b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_1
c     b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨  b^{6, 124}_0
c  in DIMACS:
 9494 -9495  9496  738 -9497 0
 9494 -9495  9496  738 -9498 0
 9494 -9495  9496  738  9499 0

c  1-1 --> 0
c    (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0 ∧ -p_738) -> (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧ -b^{6, 124}_0)
c  in CNF:
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_2
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_1
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_0
c  in DIMACS:
 9494  9495 -9496  738 -9497 0
 9494  9495 -9496  738 -9498 0
 9494  9495 -9496  738 -9499 0

c  0-1 --> -1
c    (-b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧ -p_738) -> ( b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0)
c  in CNF:
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨  b^{6, 124}_2
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_1
c     b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨  b^{6, 124}_0
c  in DIMACS:
 9494  9495  9496  738  9497 0
 9494  9495  9496  738 -9498 0
 9494  9495  9496  738  9499 0

c  -1-1 --> -2
c    ( b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧  b^{6, 123}_0 ∧ -p_738) -> ( b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0)
c  in CNF:
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨  b^{6, 124}_2
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨  b^{6, 124}_1
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨  p_738 ∨ -b^{6, 124}_0
c  in DIMACS:
-9494  9495 -9496  738  9497 0
-9494  9495 -9496  738  9498 0
-9494  9495 -9496  738 -9499 0

c  -2-1 --> break 
c    ( b^{6, 123}_2 ∧  b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨  b^{6, 123}_0 ∨  p_738 ∨ break
c  in DIMACS:
-9494 -9495  9496  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 123}_2 ∧ -b^{6, 123}_1 ∧ -b^{6, 123}_0 ∧ true) 
c  in CNF:
c    -b^{6, 123}_2 ∨  b^{6, 123}_1 ∨  b^{6, 123}_0 ∨ false 
c  in DIMACS:
-9494  9495  9496  0

c  3 does not represent an automaton state.
c    -(-b^{6, 123}_2 ∧  b^{6, 123}_1 ∧  b^{6, 123}_0 ∧ true) 
c  in CNF:
c     b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ false 
c  in DIMACS:
 9494 -9495 -9496  0
c  -3 does not represent an automaton state.
c    -( b^{6, 123}_2 ∧  b^{6, 123}_1 ∧  b^{6, 123}_0 ∧ true) 
c  in CNF:
c    -b^{6, 123}_2 ∨ -b^{6, 123}_1 ∨ -b^{6, 123}_0 ∨ false 
c  in DIMACS:
-9494 -9495 -9496  0

c i = 124
c  -2+1 --> -1
c    ( b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧  p_744) -> ( b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0)
c  in CNF:
c    -b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨  b^{6, 125}_2
c    -b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_1
c    -b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨  b^{6, 125}_0
c  in DIMACS:
-9497 -9498  9499 -744  9500 0
-9497 -9498  9499 -744 -9501 0
-9497 -9498  9499 -744  9502 0

c  -1+1 --> 0
c    ( b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0 ∧  p_744) -> (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧ -b^{6, 125}_0)
c  in CNF:
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_2
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_1
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_0
c  in DIMACS:
-9497  9498 -9499 -744 -9500 0
-9497  9498 -9499 -744 -9501 0
-9497  9498 -9499 -744 -9502 0

c  0+1 --> 1
c    (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧  p_744) -> (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0)
c  in CNF:
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_2
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_1
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨  b^{6, 125}_0
c  in DIMACS:
 9497  9498  9499 -744 -9500 0
 9497  9498  9499 -744 -9501 0
 9497  9498  9499 -744  9502 0

c  1+1 --> 2
c    (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0 ∧  p_744) -> (-b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0)
c  in CNF:
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_2
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨  b^{6, 125}_1
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ -p_744 ∨ -b^{6, 125}_0
c  in DIMACS:
 9497  9498 -9499 -744 -9500 0
 9497  9498 -9499 -744  9501 0
 9497  9498 -9499 -744 -9502 0

c  2+1 --> break 
c    (-b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧  p_744) -> break
c  in CNF:
c     b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 9497 -9498  9499 -744 1162 0


c  2-1 --> 1
c    (-b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧ -p_744) -> (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0)
c  in CNF:
c     b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_2
c     b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_1
c     b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨  b^{6, 125}_0
c  in DIMACS:
 9497 -9498  9499  744 -9500 0
 9497 -9498  9499  744 -9501 0
 9497 -9498  9499  744  9502 0

c  1-1 --> 0
c    (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0 ∧ -p_744) -> (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧ -b^{6, 125}_0)
c  in CNF:
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_2
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_1
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_0
c  in DIMACS:
 9497  9498 -9499  744 -9500 0
 9497  9498 -9499  744 -9501 0
 9497  9498 -9499  744 -9502 0

c  0-1 --> -1
c    (-b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧ -p_744) -> ( b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0)
c  in CNF:
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨  b^{6, 125}_2
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_1
c     b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨  b^{6, 125}_0
c  in DIMACS:
 9497  9498  9499  744  9500 0
 9497  9498  9499  744 -9501 0
 9497  9498  9499  744  9502 0

c  -1-1 --> -2
c    ( b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧  b^{6, 124}_0 ∧ -p_744) -> ( b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0)
c  in CNF:
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨  b^{6, 125}_2
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨  b^{6, 125}_1
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨  p_744 ∨ -b^{6, 125}_0
c  in DIMACS:
-9497  9498 -9499  744  9500 0
-9497  9498 -9499  744  9501 0
-9497  9498 -9499  744 -9502 0

c  -2-1 --> break 
c    ( b^{6, 124}_2 ∧  b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨  b^{6, 124}_0 ∨  p_744 ∨ break
c  in DIMACS:
-9497 -9498  9499  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 124}_2 ∧ -b^{6, 124}_1 ∧ -b^{6, 124}_0 ∧ true) 
c  in CNF:
c    -b^{6, 124}_2 ∨  b^{6, 124}_1 ∨  b^{6, 124}_0 ∨ false 
c  in DIMACS:
-9497  9498  9499  0

c  3 does not represent an automaton state.
c    -(-b^{6, 124}_2 ∧  b^{6, 124}_1 ∧  b^{6, 124}_0 ∧ true) 
c  in CNF:
c     b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ false 
c  in DIMACS:
 9497 -9498 -9499  0
c  -3 does not represent an automaton state.
c    -( b^{6, 124}_2 ∧  b^{6, 124}_1 ∧  b^{6, 124}_0 ∧ true) 
c  in CNF:
c    -b^{6, 124}_2 ∨ -b^{6, 124}_1 ∨ -b^{6, 124}_0 ∨ false 
c  in DIMACS:
-9497 -9498 -9499  0

c i = 125
c  -2+1 --> -1
c    ( b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧  p_750) -> ( b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0)
c  in CNF:
c    -b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨  b^{6, 126}_2
c    -b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_1
c    -b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨  b^{6, 126}_0
c  in DIMACS:
-9500 -9501  9502 -750  9503 0
-9500 -9501  9502 -750 -9504 0
-9500 -9501  9502 -750  9505 0

c  -1+1 --> 0
c    ( b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0 ∧  p_750) -> (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧ -b^{6, 126}_0)
c  in CNF:
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_2
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_1
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_0
c  in DIMACS:
-9500  9501 -9502 -750 -9503 0
-9500  9501 -9502 -750 -9504 0
-9500  9501 -9502 -750 -9505 0

c  0+1 --> 1
c    (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧  p_750) -> (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0)
c  in CNF:
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_2
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_1
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨  b^{6, 126}_0
c  in DIMACS:
 9500  9501  9502 -750 -9503 0
 9500  9501  9502 -750 -9504 0
 9500  9501  9502 -750  9505 0

c  1+1 --> 2
c    (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0 ∧  p_750) -> (-b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0)
c  in CNF:
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_2
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨  b^{6, 126}_1
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ -p_750 ∨ -b^{6, 126}_0
c  in DIMACS:
 9500  9501 -9502 -750 -9503 0
 9500  9501 -9502 -750  9504 0
 9500  9501 -9502 -750 -9505 0

c  2+1 --> break 
c    (-b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧  p_750) -> break
c  in CNF:
c     b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 9500 -9501  9502 -750 1162 0


c  2-1 --> 1
c    (-b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧ -p_750) -> (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0)
c  in CNF:
c     b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_2
c     b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_1
c     b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨  b^{6, 126}_0
c  in DIMACS:
 9500 -9501  9502  750 -9503 0
 9500 -9501  9502  750 -9504 0
 9500 -9501  9502  750  9505 0

c  1-1 --> 0
c    (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0 ∧ -p_750) -> (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧ -b^{6, 126}_0)
c  in CNF:
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_2
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_1
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_0
c  in DIMACS:
 9500  9501 -9502  750 -9503 0
 9500  9501 -9502  750 -9504 0
 9500  9501 -9502  750 -9505 0

c  0-1 --> -1
c    (-b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧ -p_750) -> ( b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0)
c  in CNF:
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨  b^{6, 126}_2
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_1
c     b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨  b^{6, 126}_0
c  in DIMACS:
 9500  9501  9502  750  9503 0
 9500  9501  9502  750 -9504 0
 9500  9501  9502  750  9505 0

c  -1-1 --> -2
c    ( b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧  b^{6, 125}_0 ∧ -p_750) -> ( b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0)
c  in CNF:
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨  b^{6, 126}_2
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨  b^{6, 126}_1
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨  p_750 ∨ -b^{6, 126}_0
c  in DIMACS:
-9500  9501 -9502  750  9503 0
-9500  9501 -9502  750  9504 0
-9500  9501 -9502  750 -9505 0

c  -2-1 --> break 
c    ( b^{6, 125}_2 ∧  b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨  b^{6, 125}_0 ∨  p_750 ∨ break
c  in DIMACS:
-9500 -9501  9502  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 125}_2 ∧ -b^{6, 125}_1 ∧ -b^{6, 125}_0 ∧ true) 
c  in CNF:
c    -b^{6, 125}_2 ∨  b^{6, 125}_1 ∨  b^{6, 125}_0 ∨ false 
c  in DIMACS:
-9500  9501  9502  0

c  3 does not represent an automaton state.
c    -(-b^{6, 125}_2 ∧  b^{6, 125}_1 ∧  b^{6, 125}_0 ∧ true) 
c  in CNF:
c     b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ false 
c  in DIMACS:
 9500 -9501 -9502  0
c  -3 does not represent an automaton state.
c    -( b^{6, 125}_2 ∧  b^{6, 125}_1 ∧  b^{6, 125}_0 ∧ true) 
c  in CNF:
c    -b^{6, 125}_2 ∨ -b^{6, 125}_1 ∨ -b^{6, 125}_0 ∨ false 
c  in DIMACS:
-9500 -9501 -9502  0

c i = 126
c  -2+1 --> -1
c    ( b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧  p_756) -> ( b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0)
c  in CNF:
c    -b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨  b^{6, 127}_2
c    -b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_1
c    -b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨  b^{6, 127}_0
c  in DIMACS:
-9503 -9504  9505 -756  9506 0
-9503 -9504  9505 -756 -9507 0
-9503 -9504  9505 -756  9508 0

c  -1+1 --> 0
c    ( b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0 ∧  p_756) -> (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧ -b^{6, 127}_0)
c  in CNF:
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_2
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_1
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_0
c  in DIMACS:
-9503  9504 -9505 -756 -9506 0
-9503  9504 -9505 -756 -9507 0
-9503  9504 -9505 -756 -9508 0

c  0+1 --> 1
c    (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧  p_756) -> (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0)
c  in CNF:
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_2
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_1
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨  b^{6, 127}_0
c  in DIMACS:
 9503  9504  9505 -756 -9506 0
 9503  9504  9505 -756 -9507 0
 9503  9504  9505 -756  9508 0

c  1+1 --> 2
c    (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0 ∧  p_756) -> (-b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0)
c  in CNF:
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_2
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨  b^{6, 127}_1
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ -p_756 ∨ -b^{6, 127}_0
c  in DIMACS:
 9503  9504 -9505 -756 -9506 0
 9503  9504 -9505 -756  9507 0
 9503  9504 -9505 -756 -9508 0

c  2+1 --> break 
c    (-b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧  p_756) -> break
c  in CNF:
c     b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 9503 -9504  9505 -756 1162 0


c  2-1 --> 1
c    (-b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧ -p_756) -> (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0)
c  in CNF:
c     b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_2
c     b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_1
c     b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨  b^{6, 127}_0
c  in DIMACS:
 9503 -9504  9505  756 -9506 0
 9503 -9504  9505  756 -9507 0
 9503 -9504  9505  756  9508 0

c  1-1 --> 0
c    (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0 ∧ -p_756) -> (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧ -b^{6, 127}_0)
c  in CNF:
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_2
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_1
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_0
c  in DIMACS:
 9503  9504 -9505  756 -9506 0
 9503  9504 -9505  756 -9507 0
 9503  9504 -9505  756 -9508 0

c  0-1 --> -1
c    (-b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧ -p_756) -> ( b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0)
c  in CNF:
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨  b^{6, 127}_2
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_1
c     b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨  b^{6, 127}_0
c  in DIMACS:
 9503  9504  9505  756  9506 0
 9503  9504  9505  756 -9507 0
 9503  9504  9505  756  9508 0

c  -1-1 --> -2
c    ( b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧  b^{6, 126}_0 ∧ -p_756) -> ( b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0)
c  in CNF:
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨  b^{6, 127}_2
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨  b^{6, 127}_1
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨  p_756 ∨ -b^{6, 127}_0
c  in DIMACS:
-9503  9504 -9505  756  9506 0
-9503  9504 -9505  756  9507 0
-9503  9504 -9505  756 -9508 0

c  -2-1 --> break 
c    ( b^{6, 126}_2 ∧  b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨  b^{6, 126}_0 ∨  p_756 ∨ break
c  in DIMACS:
-9503 -9504  9505  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 126}_2 ∧ -b^{6, 126}_1 ∧ -b^{6, 126}_0 ∧ true) 
c  in CNF:
c    -b^{6, 126}_2 ∨  b^{6, 126}_1 ∨  b^{6, 126}_0 ∨ false 
c  in DIMACS:
-9503  9504  9505  0

c  3 does not represent an automaton state.
c    -(-b^{6, 126}_2 ∧  b^{6, 126}_1 ∧  b^{6, 126}_0 ∧ true) 
c  in CNF:
c     b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ false 
c  in DIMACS:
 9503 -9504 -9505  0
c  -3 does not represent an automaton state.
c    -( b^{6, 126}_2 ∧  b^{6, 126}_1 ∧  b^{6, 126}_0 ∧ true) 
c  in CNF:
c    -b^{6, 126}_2 ∨ -b^{6, 126}_1 ∨ -b^{6, 126}_0 ∨ false 
c  in DIMACS:
-9503 -9504 -9505  0

c i = 127
c  -2+1 --> -1
c    ( b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧  p_762) -> ( b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0)
c  in CNF:
c    -b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨  b^{6, 128}_2
c    -b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_1
c    -b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨  b^{6, 128}_0
c  in DIMACS:
-9506 -9507  9508 -762  9509 0
-9506 -9507  9508 -762 -9510 0
-9506 -9507  9508 -762  9511 0

c  -1+1 --> 0
c    ( b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0 ∧  p_762) -> (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧ -b^{6, 128}_0)
c  in CNF:
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_2
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_1
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_0
c  in DIMACS:
-9506  9507 -9508 -762 -9509 0
-9506  9507 -9508 -762 -9510 0
-9506  9507 -9508 -762 -9511 0

c  0+1 --> 1
c    (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧  p_762) -> (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0)
c  in CNF:
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_2
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_1
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨  b^{6, 128}_0
c  in DIMACS:
 9506  9507  9508 -762 -9509 0
 9506  9507  9508 -762 -9510 0
 9506  9507  9508 -762  9511 0

c  1+1 --> 2
c    (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0 ∧  p_762) -> (-b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0)
c  in CNF:
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_2
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨  b^{6, 128}_1
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ -p_762 ∨ -b^{6, 128}_0
c  in DIMACS:
 9506  9507 -9508 -762 -9509 0
 9506  9507 -9508 -762  9510 0
 9506  9507 -9508 -762 -9511 0

c  2+1 --> break 
c    (-b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧  p_762) -> break
c  in CNF:
c     b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 9506 -9507  9508 -762 1162 0


c  2-1 --> 1
c    (-b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧ -p_762) -> (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0)
c  in CNF:
c     b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_2
c     b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_1
c     b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨  b^{6, 128}_0
c  in DIMACS:
 9506 -9507  9508  762 -9509 0
 9506 -9507  9508  762 -9510 0
 9506 -9507  9508  762  9511 0

c  1-1 --> 0
c    (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0 ∧ -p_762) -> (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧ -b^{6, 128}_0)
c  in CNF:
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_2
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_1
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_0
c  in DIMACS:
 9506  9507 -9508  762 -9509 0
 9506  9507 -9508  762 -9510 0
 9506  9507 -9508  762 -9511 0

c  0-1 --> -1
c    (-b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧ -p_762) -> ( b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0)
c  in CNF:
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨  b^{6, 128}_2
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_1
c     b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨  b^{6, 128}_0
c  in DIMACS:
 9506  9507  9508  762  9509 0
 9506  9507  9508  762 -9510 0
 9506  9507  9508  762  9511 0

c  -1-1 --> -2
c    ( b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧  b^{6, 127}_0 ∧ -p_762) -> ( b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0)
c  in CNF:
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨  b^{6, 128}_2
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨  b^{6, 128}_1
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨  p_762 ∨ -b^{6, 128}_0
c  in DIMACS:
-9506  9507 -9508  762  9509 0
-9506  9507 -9508  762  9510 0
-9506  9507 -9508  762 -9511 0

c  -2-1 --> break 
c    ( b^{6, 127}_2 ∧  b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨  b^{6, 127}_0 ∨  p_762 ∨ break
c  in DIMACS:
-9506 -9507  9508  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 127}_2 ∧ -b^{6, 127}_1 ∧ -b^{6, 127}_0 ∧ true) 
c  in CNF:
c    -b^{6, 127}_2 ∨  b^{6, 127}_1 ∨  b^{6, 127}_0 ∨ false 
c  in DIMACS:
-9506  9507  9508  0

c  3 does not represent an automaton state.
c    -(-b^{6, 127}_2 ∧  b^{6, 127}_1 ∧  b^{6, 127}_0 ∧ true) 
c  in CNF:
c     b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ false 
c  in DIMACS:
 9506 -9507 -9508  0
c  -3 does not represent an automaton state.
c    -( b^{6, 127}_2 ∧  b^{6, 127}_1 ∧  b^{6, 127}_0 ∧ true) 
c  in CNF:
c    -b^{6, 127}_2 ∨ -b^{6, 127}_1 ∨ -b^{6, 127}_0 ∨ false 
c  in DIMACS:
-9506 -9507 -9508  0

c i = 128
c  -2+1 --> -1
c    ( b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧  p_768) -> ( b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0)
c  in CNF:
c    -b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨  b^{6, 129}_2
c    -b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_1
c    -b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨  b^{6, 129}_0
c  in DIMACS:
-9509 -9510  9511 -768  9512 0
-9509 -9510  9511 -768 -9513 0
-9509 -9510  9511 -768  9514 0

c  -1+1 --> 0
c    ( b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0 ∧  p_768) -> (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧ -b^{6, 129}_0)
c  in CNF:
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_2
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_1
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_0
c  in DIMACS:
-9509  9510 -9511 -768 -9512 0
-9509  9510 -9511 -768 -9513 0
-9509  9510 -9511 -768 -9514 0

c  0+1 --> 1
c    (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧  p_768) -> (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0)
c  in CNF:
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_2
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_1
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨  b^{6, 129}_0
c  in DIMACS:
 9509  9510  9511 -768 -9512 0
 9509  9510  9511 -768 -9513 0
 9509  9510  9511 -768  9514 0

c  1+1 --> 2
c    (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0 ∧  p_768) -> (-b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0)
c  in CNF:
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_2
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨  b^{6, 129}_1
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ -p_768 ∨ -b^{6, 129}_0
c  in DIMACS:
 9509  9510 -9511 -768 -9512 0
 9509  9510 -9511 -768  9513 0
 9509  9510 -9511 -768 -9514 0

c  2+1 --> break 
c    (-b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧  p_768) -> break
c  in CNF:
c     b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 9509 -9510  9511 -768 1162 0


c  2-1 --> 1
c    (-b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧ -p_768) -> (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0)
c  in CNF:
c     b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_2
c     b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_1
c     b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨  b^{6, 129}_0
c  in DIMACS:
 9509 -9510  9511  768 -9512 0
 9509 -9510  9511  768 -9513 0
 9509 -9510  9511  768  9514 0

c  1-1 --> 0
c    (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0 ∧ -p_768) -> (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧ -b^{6, 129}_0)
c  in CNF:
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_2
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_1
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_0
c  in DIMACS:
 9509  9510 -9511  768 -9512 0
 9509  9510 -9511  768 -9513 0
 9509  9510 -9511  768 -9514 0

c  0-1 --> -1
c    (-b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧ -p_768) -> ( b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0)
c  in CNF:
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨  b^{6, 129}_2
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_1
c     b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨  b^{6, 129}_0
c  in DIMACS:
 9509  9510  9511  768  9512 0
 9509  9510  9511  768 -9513 0
 9509  9510  9511  768  9514 0

c  -1-1 --> -2
c    ( b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧  b^{6, 128}_0 ∧ -p_768) -> ( b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0)
c  in CNF:
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨  b^{6, 129}_2
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨  b^{6, 129}_1
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨  p_768 ∨ -b^{6, 129}_0
c  in DIMACS:
-9509  9510 -9511  768  9512 0
-9509  9510 -9511  768  9513 0
-9509  9510 -9511  768 -9514 0

c  -2-1 --> break 
c    ( b^{6, 128}_2 ∧  b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨  b^{6, 128}_0 ∨  p_768 ∨ break
c  in DIMACS:
-9509 -9510  9511  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 128}_2 ∧ -b^{6, 128}_1 ∧ -b^{6, 128}_0 ∧ true) 
c  in CNF:
c    -b^{6, 128}_2 ∨  b^{6, 128}_1 ∨  b^{6, 128}_0 ∨ false 
c  in DIMACS:
-9509  9510  9511  0

c  3 does not represent an automaton state.
c    -(-b^{6, 128}_2 ∧  b^{6, 128}_1 ∧  b^{6, 128}_0 ∧ true) 
c  in CNF:
c     b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ false 
c  in DIMACS:
 9509 -9510 -9511  0
c  -3 does not represent an automaton state.
c    -( b^{6, 128}_2 ∧  b^{6, 128}_1 ∧  b^{6, 128}_0 ∧ true) 
c  in CNF:
c    -b^{6, 128}_2 ∨ -b^{6, 128}_1 ∨ -b^{6, 128}_0 ∨ false 
c  in DIMACS:
-9509 -9510 -9511  0

c i = 129
c  -2+1 --> -1
c    ( b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧  p_774) -> ( b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0)
c  in CNF:
c    -b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨  b^{6, 130}_2
c    -b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_1
c    -b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨  b^{6, 130}_0
c  in DIMACS:
-9512 -9513  9514 -774  9515 0
-9512 -9513  9514 -774 -9516 0
-9512 -9513  9514 -774  9517 0

c  -1+1 --> 0
c    ( b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0 ∧  p_774) -> (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧ -b^{6, 130}_0)
c  in CNF:
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_2
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_1
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_0
c  in DIMACS:
-9512  9513 -9514 -774 -9515 0
-9512  9513 -9514 -774 -9516 0
-9512  9513 -9514 -774 -9517 0

c  0+1 --> 1
c    (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧  p_774) -> (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0)
c  in CNF:
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_2
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_1
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨  b^{6, 130}_0
c  in DIMACS:
 9512  9513  9514 -774 -9515 0
 9512  9513  9514 -774 -9516 0
 9512  9513  9514 -774  9517 0

c  1+1 --> 2
c    (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0 ∧  p_774) -> (-b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0)
c  in CNF:
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_2
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨  b^{6, 130}_1
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ -p_774 ∨ -b^{6, 130}_0
c  in DIMACS:
 9512  9513 -9514 -774 -9515 0
 9512  9513 -9514 -774  9516 0
 9512  9513 -9514 -774 -9517 0

c  2+1 --> break 
c    (-b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧  p_774) -> break
c  in CNF:
c     b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 9512 -9513  9514 -774 1162 0


c  2-1 --> 1
c    (-b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧ -p_774) -> (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0)
c  in CNF:
c     b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_2
c     b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_1
c     b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨  b^{6, 130}_0
c  in DIMACS:
 9512 -9513  9514  774 -9515 0
 9512 -9513  9514  774 -9516 0
 9512 -9513  9514  774  9517 0

c  1-1 --> 0
c    (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0 ∧ -p_774) -> (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧ -b^{6, 130}_0)
c  in CNF:
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_2
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_1
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_0
c  in DIMACS:
 9512  9513 -9514  774 -9515 0
 9512  9513 -9514  774 -9516 0
 9512  9513 -9514  774 -9517 0

c  0-1 --> -1
c    (-b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧ -p_774) -> ( b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0)
c  in CNF:
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨  b^{6, 130}_2
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_1
c     b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨  b^{6, 130}_0
c  in DIMACS:
 9512  9513  9514  774  9515 0
 9512  9513  9514  774 -9516 0
 9512  9513  9514  774  9517 0

c  -1-1 --> -2
c    ( b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧  b^{6, 129}_0 ∧ -p_774) -> ( b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0)
c  in CNF:
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨  b^{6, 130}_2
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨  b^{6, 130}_1
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨  p_774 ∨ -b^{6, 130}_0
c  in DIMACS:
-9512  9513 -9514  774  9515 0
-9512  9513 -9514  774  9516 0
-9512  9513 -9514  774 -9517 0

c  -2-1 --> break 
c    ( b^{6, 129}_2 ∧  b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨  b^{6, 129}_0 ∨  p_774 ∨ break
c  in DIMACS:
-9512 -9513  9514  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 129}_2 ∧ -b^{6, 129}_1 ∧ -b^{6, 129}_0 ∧ true) 
c  in CNF:
c    -b^{6, 129}_2 ∨  b^{6, 129}_1 ∨  b^{6, 129}_0 ∨ false 
c  in DIMACS:
-9512  9513  9514  0

c  3 does not represent an automaton state.
c    -(-b^{6, 129}_2 ∧  b^{6, 129}_1 ∧  b^{6, 129}_0 ∧ true) 
c  in CNF:
c     b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ false 
c  in DIMACS:
 9512 -9513 -9514  0
c  -3 does not represent an automaton state.
c    -( b^{6, 129}_2 ∧  b^{6, 129}_1 ∧  b^{6, 129}_0 ∧ true) 
c  in CNF:
c    -b^{6, 129}_2 ∨ -b^{6, 129}_1 ∨ -b^{6, 129}_0 ∨ false 
c  in DIMACS:
-9512 -9513 -9514  0

c i = 130
c  -2+1 --> -1
c    ( b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧  p_780) -> ( b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0)
c  in CNF:
c    -b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨  b^{6, 131}_2
c    -b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_1
c    -b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨  b^{6, 131}_0
c  in DIMACS:
-9515 -9516  9517 -780  9518 0
-9515 -9516  9517 -780 -9519 0
-9515 -9516  9517 -780  9520 0

c  -1+1 --> 0
c    ( b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0 ∧  p_780) -> (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧ -b^{6, 131}_0)
c  in CNF:
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_2
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_1
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_0
c  in DIMACS:
-9515  9516 -9517 -780 -9518 0
-9515  9516 -9517 -780 -9519 0
-9515  9516 -9517 -780 -9520 0

c  0+1 --> 1
c    (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧  p_780) -> (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0)
c  in CNF:
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_2
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_1
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨  b^{6, 131}_0
c  in DIMACS:
 9515  9516  9517 -780 -9518 0
 9515  9516  9517 -780 -9519 0
 9515  9516  9517 -780  9520 0

c  1+1 --> 2
c    (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0 ∧  p_780) -> (-b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0)
c  in CNF:
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_2
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨  b^{6, 131}_1
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ -p_780 ∨ -b^{6, 131}_0
c  in DIMACS:
 9515  9516 -9517 -780 -9518 0
 9515  9516 -9517 -780  9519 0
 9515  9516 -9517 -780 -9520 0

c  2+1 --> break 
c    (-b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧  p_780) -> break
c  in CNF:
c     b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 9515 -9516  9517 -780 1162 0


c  2-1 --> 1
c    (-b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧ -p_780) -> (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0)
c  in CNF:
c     b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_2
c     b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_1
c     b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨  b^{6, 131}_0
c  in DIMACS:
 9515 -9516  9517  780 -9518 0
 9515 -9516  9517  780 -9519 0
 9515 -9516  9517  780  9520 0

c  1-1 --> 0
c    (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0 ∧ -p_780) -> (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧ -b^{6, 131}_0)
c  in CNF:
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_2
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_1
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_0
c  in DIMACS:
 9515  9516 -9517  780 -9518 0
 9515  9516 -9517  780 -9519 0
 9515  9516 -9517  780 -9520 0

c  0-1 --> -1
c    (-b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧ -p_780) -> ( b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0)
c  in CNF:
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨  b^{6, 131}_2
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_1
c     b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨  b^{6, 131}_0
c  in DIMACS:
 9515  9516  9517  780  9518 0
 9515  9516  9517  780 -9519 0
 9515  9516  9517  780  9520 0

c  -1-1 --> -2
c    ( b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧  b^{6, 130}_0 ∧ -p_780) -> ( b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0)
c  in CNF:
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨  b^{6, 131}_2
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨  b^{6, 131}_1
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨  p_780 ∨ -b^{6, 131}_0
c  in DIMACS:
-9515  9516 -9517  780  9518 0
-9515  9516 -9517  780  9519 0
-9515  9516 -9517  780 -9520 0

c  -2-1 --> break 
c    ( b^{6, 130}_2 ∧  b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨  b^{6, 130}_0 ∨  p_780 ∨ break
c  in DIMACS:
-9515 -9516  9517  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 130}_2 ∧ -b^{6, 130}_1 ∧ -b^{6, 130}_0 ∧ true) 
c  in CNF:
c    -b^{6, 130}_2 ∨  b^{6, 130}_1 ∨  b^{6, 130}_0 ∨ false 
c  in DIMACS:
-9515  9516  9517  0

c  3 does not represent an automaton state.
c    -(-b^{6, 130}_2 ∧  b^{6, 130}_1 ∧  b^{6, 130}_0 ∧ true) 
c  in CNF:
c     b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ false 
c  in DIMACS:
 9515 -9516 -9517  0
c  -3 does not represent an automaton state.
c    -( b^{6, 130}_2 ∧  b^{6, 130}_1 ∧  b^{6, 130}_0 ∧ true) 
c  in CNF:
c    -b^{6, 130}_2 ∨ -b^{6, 130}_1 ∨ -b^{6, 130}_0 ∨ false 
c  in DIMACS:
-9515 -9516 -9517  0

c i = 131
c  -2+1 --> -1
c    ( b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧  p_786) -> ( b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0)
c  in CNF:
c    -b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨  b^{6, 132}_2
c    -b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_1
c    -b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨  b^{6, 132}_0
c  in DIMACS:
-9518 -9519  9520 -786  9521 0
-9518 -9519  9520 -786 -9522 0
-9518 -9519  9520 -786  9523 0

c  -1+1 --> 0
c    ( b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0 ∧  p_786) -> (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧ -b^{6, 132}_0)
c  in CNF:
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_2
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_1
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_0
c  in DIMACS:
-9518  9519 -9520 -786 -9521 0
-9518  9519 -9520 -786 -9522 0
-9518  9519 -9520 -786 -9523 0

c  0+1 --> 1
c    (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧  p_786) -> (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0)
c  in CNF:
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_2
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_1
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨  b^{6, 132}_0
c  in DIMACS:
 9518  9519  9520 -786 -9521 0
 9518  9519  9520 -786 -9522 0
 9518  9519  9520 -786  9523 0

c  1+1 --> 2
c    (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0 ∧  p_786) -> (-b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0)
c  in CNF:
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_2
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨  b^{6, 132}_1
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ -p_786 ∨ -b^{6, 132}_0
c  in DIMACS:
 9518  9519 -9520 -786 -9521 0
 9518  9519 -9520 -786  9522 0
 9518  9519 -9520 -786 -9523 0

c  2+1 --> break 
c    (-b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧  p_786) -> break
c  in CNF:
c     b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 9518 -9519  9520 -786 1162 0


c  2-1 --> 1
c    (-b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧ -p_786) -> (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0)
c  in CNF:
c     b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_2
c     b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_1
c     b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨  b^{6, 132}_0
c  in DIMACS:
 9518 -9519  9520  786 -9521 0
 9518 -9519  9520  786 -9522 0
 9518 -9519  9520  786  9523 0

c  1-1 --> 0
c    (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0 ∧ -p_786) -> (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧ -b^{6, 132}_0)
c  in CNF:
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_2
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_1
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_0
c  in DIMACS:
 9518  9519 -9520  786 -9521 0
 9518  9519 -9520  786 -9522 0
 9518  9519 -9520  786 -9523 0

c  0-1 --> -1
c    (-b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧ -p_786) -> ( b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0)
c  in CNF:
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨  b^{6, 132}_2
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_1
c     b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨  b^{6, 132}_0
c  in DIMACS:
 9518  9519  9520  786  9521 0
 9518  9519  9520  786 -9522 0
 9518  9519  9520  786  9523 0

c  -1-1 --> -2
c    ( b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧  b^{6, 131}_0 ∧ -p_786) -> ( b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0)
c  in CNF:
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨  b^{6, 132}_2
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨  b^{6, 132}_1
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨  p_786 ∨ -b^{6, 132}_0
c  in DIMACS:
-9518  9519 -9520  786  9521 0
-9518  9519 -9520  786  9522 0
-9518  9519 -9520  786 -9523 0

c  -2-1 --> break 
c    ( b^{6, 131}_2 ∧  b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨  b^{6, 131}_0 ∨  p_786 ∨ break
c  in DIMACS:
-9518 -9519  9520  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 131}_2 ∧ -b^{6, 131}_1 ∧ -b^{6, 131}_0 ∧ true) 
c  in CNF:
c    -b^{6, 131}_2 ∨  b^{6, 131}_1 ∨  b^{6, 131}_0 ∨ false 
c  in DIMACS:
-9518  9519  9520  0

c  3 does not represent an automaton state.
c    -(-b^{6, 131}_2 ∧  b^{6, 131}_1 ∧  b^{6, 131}_0 ∧ true) 
c  in CNF:
c     b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ false 
c  in DIMACS:
 9518 -9519 -9520  0
c  -3 does not represent an automaton state.
c    -( b^{6, 131}_2 ∧  b^{6, 131}_1 ∧  b^{6, 131}_0 ∧ true) 
c  in CNF:
c    -b^{6, 131}_2 ∨ -b^{6, 131}_1 ∨ -b^{6, 131}_0 ∨ false 
c  in DIMACS:
-9518 -9519 -9520  0

c i = 132
c  -2+1 --> -1
c    ( b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧  p_792) -> ( b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0)
c  in CNF:
c    -b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨  b^{6, 133}_2
c    -b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_1
c    -b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨  b^{6, 133}_0
c  in DIMACS:
-9521 -9522  9523 -792  9524 0
-9521 -9522  9523 -792 -9525 0
-9521 -9522  9523 -792  9526 0

c  -1+1 --> 0
c    ( b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0 ∧  p_792) -> (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧ -b^{6, 133}_0)
c  in CNF:
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_2
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_1
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_0
c  in DIMACS:
-9521  9522 -9523 -792 -9524 0
-9521  9522 -9523 -792 -9525 0
-9521  9522 -9523 -792 -9526 0

c  0+1 --> 1
c    (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧  p_792) -> (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0)
c  in CNF:
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_2
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_1
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨  b^{6, 133}_0
c  in DIMACS:
 9521  9522  9523 -792 -9524 0
 9521  9522  9523 -792 -9525 0
 9521  9522  9523 -792  9526 0

c  1+1 --> 2
c    (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0 ∧  p_792) -> (-b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0)
c  in CNF:
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_2
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨  b^{6, 133}_1
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ -p_792 ∨ -b^{6, 133}_0
c  in DIMACS:
 9521  9522 -9523 -792 -9524 0
 9521  9522 -9523 -792  9525 0
 9521  9522 -9523 -792 -9526 0

c  2+1 --> break 
c    (-b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧  p_792) -> break
c  in CNF:
c     b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 9521 -9522  9523 -792 1162 0


c  2-1 --> 1
c    (-b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧ -p_792) -> (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0)
c  in CNF:
c     b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_2
c     b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_1
c     b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨  b^{6, 133}_0
c  in DIMACS:
 9521 -9522  9523  792 -9524 0
 9521 -9522  9523  792 -9525 0
 9521 -9522  9523  792  9526 0

c  1-1 --> 0
c    (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0 ∧ -p_792) -> (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧ -b^{6, 133}_0)
c  in CNF:
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_2
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_1
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_0
c  in DIMACS:
 9521  9522 -9523  792 -9524 0
 9521  9522 -9523  792 -9525 0
 9521  9522 -9523  792 -9526 0

c  0-1 --> -1
c    (-b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧ -p_792) -> ( b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0)
c  in CNF:
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨  b^{6, 133}_2
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_1
c     b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨  b^{6, 133}_0
c  in DIMACS:
 9521  9522  9523  792  9524 0
 9521  9522  9523  792 -9525 0
 9521  9522  9523  792  9526 0

c  -1-1 --> -2
c    ( b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧  b^{6, 132}_0 ∧ -p_792) -> ( b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0)
c  in CNF:
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨  b^{6, 133}_2
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨  b^{6, 133}_1
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨  p_792 ∨ -b^{6, 133}_0
c  in DIMACS:
-9521  9522 -9523  792  9524 0
-9521  9522 -9523  792  9525 0
-9521  9522 -9523  792 -9526 0

c  -2-1 --> break 
c    ( b^{6, 132}_2 ∧  b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨  b^{6, 132}_0 ∨  p_792 ∨ break
c  in DIMACS:
-9521 -9522  9523  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 132}_2 ∧ -b^{6, 132}_1 ∧ -b^{6, 132}_0 ∧ true) 
c  in CNF:
c    -b^{6, 132}_2 ∨  b^{6, 132}_1 ∨  b^{6, 132}_0 ∨ false 
c  in DIMACS:
-9521  9522  9523  0

c  3 does not represent an automaton state.
c    -(-b^{6, 132}_2 ∧  b^{6, 132}_1 ∧  b^{6, 132}_0 ∧ true) 
c  in CNF:
c     b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ false 
c  in DIMACS:
 9521 -9522 -9523  0
c  -3 does not represent an automaton state.
c    -( b^{6, 132}_2 ∧  b^{6, 132}_1 ∧  b^{6, 132}_0 ∧ true) 
c  in CNF:
c    -b^{6, 132}_2 ∨ -b^{6, 132}_1 ∨ -b^{6, 132}_0 ∨ false 
c  in DIMACS:
-9521 -9522 -9523  0

c i = 133
c  -2+1 --> -1
c    ( b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧  p_798) -> ( b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0)
c  in CNF:
c    -b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨  b^{6, 134}_2
c    -b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_1
c    -b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨  b^{6, 134}_0
c  in DIMACS:
-9524 -9525  9526 -798  9527 0
-9524 -9525  9526 -798 -9528 0
-9524 -9525  9526 -798  9529 0

c  -1+1 --> 0
c    ( b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0 ∧  p_798) -> (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧ -b^{6, 134}_0)
c  in CNF:
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_2
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_1
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_0
c  in DIMACS:
-9524  9525 -9526 -798 -9527 0
-9524  9525 -9526 -798 -9528 0
-9524  9525 -9526 -798 -9529 0

c  0+1 --> 1
c    (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧  p_798) -> (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0)
c  in CNF:
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_2
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_1
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨  b^{6, 134}_0
c  in DIMACS:
 9524  9525  9526 -798 -9527 0
 9524  9525  9526 -798 -9528 0
 9524  9525  9526 -798  9529 0

c  1+1 --> 2
c    (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0 ∧  p_798) -> (-b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0)
c  in CNF:
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_2
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨  b^{6, 134}_1
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ -p_798 ∨ -b^{6, 134}_0
c  in DIMACS:
 9524  9525 -9526 -798 -9527 0
 9524  9525 -9526 -798  9528 0
 9524  9525 -9526 -798 -9529 0

c  2+1 --> break 
c    (-b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧  p_798) -> break
c  in CNF:
c     b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 9524 -9525  9526 -798 1162 0


c  2-1 --> 1
c    (-b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧ -p_798) -> (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0)
c  in CNF:
c     b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_2
c     b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_1
c     b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨  b^{6, 134}_0
c  in DIMACS:
 9524 -9525  9526  798 -9527 0
 9524 -9525  9526  798 -9528 0
 9524 -9525  9526  798  9529 0

c  1-1 --> 0
c    (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0 ∧ -p_798) -> (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧ -b^{6, 134}_0)
c  in CNF:
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_2
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_1
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_0
c  in DIMACS:
 9524  9525 -9526  798 -9527 0
 9524  9525 -9526  798 -9528 0
 9524  9525 -9526  798 -9529 0

c  0-1 --> -1
c    (-b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧ -p_798) -> ( b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0)
c  in CNF:
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨  b^{6, 134}_2
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_1
c     b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨  b^{6, 134}_0
c  in DIMACS:
 9524  9525  9526  798  9527 0
 9524  9525  9526  798 -9528 0
 9524  9525  9526  798  9529 0

c  -1-1 --> -2
c    ( b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧  b^{6, 133}_0 ∧ -p_798) -> ( b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0)
c  in CNF:
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨  b^{6, 134}_2
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨  b^{6, 134}_1
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨  p_798 ∨ -b^{6, 134}_0
c  in DIMACS:
-9524  9525 -9526  798  9527 0
-9524  9525 -9526  798  9528 0
-9524  9525 -9526  798 -9529 0

c  -2-1 --> break 
c    ( b^{6, 133}_2 ∧  b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨  b^{6, 133}_0 ∨  p_798 ∨ break
c  in DIMACS:
-9524 -9525  9526  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 133}_2 ∧ -b^{6, 133}_1 ∧ -b^{6, 133}_0 ∧ true) 
c  in CNF:
c    -b^{6, 133}_2 ∨  b^{6, 133}_1 ∨  b^{6, 133}_0 ∨ false 
c  in DIMACS:
-9524  9525  9526  0

c  3 does not represent an automaton state.
c    -(-b^{6, 133}_2 ∧  b^{6, 133}_1 ∧  b^{6, 133}_0 ∧ true) 
c  in CNF:
c     b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ false 
c  in DIMACS:
 9524 -9525 -9526  0
c  -3 does not represent an automaton state.
c    -( b^{6, 133}_2 ∧  b^{6, 133}_1 ∧  b^{6, 133}_0 ∧ true) 
c  in CNF:
c    -b^{6, 133}_2 ∨ -b^{6, 133}_1 ∨ -b^{6, 133}_0 ∨ false 
c  in DIMACS:
-9524 -9525 -9526  0

c i = 134
c  -2+1 --> -1
c    ( b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧  p_804) -> ( b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0)
c  in CNF:
c    -b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨  b^{6, 135}_2
c    -b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_1
c    -b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨  b^{6, 135}_0
c  in DIMACS:
-9527 -9528  9529 -804  9530 0
-9527 -9528  9529 -804 -9531 0
-9527 -9528  9529 -804  9532 0

c  -1+1 --> 0
c    ( b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0 ∧  p_804) -> (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧ -b^{6, 135}_0)
c  in CNF:
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_2
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_1
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_0
c  in DIMACS:
-9527  9528 -9529 -804 -9530 0
-9527  9528 -9529 -804 -9531 0
-9527  9528 -9529 -804 -9532 0

c  0+1 --> 1
c    (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧  p_804) -> (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0)
c  in CNF:
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_2
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_1
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨  b^{6, 135}_0
c  in DIMACS:
 9527  9528  9529 -804 -9530 0
 9527  9528  9529 -804 -9531 0
 9527  9528  9529 -804  9532 0

c  1+1 --> 2
c    (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0 ∧  p_804) -> (-b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0)
c  in CNF:
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_2
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨  b^{6, 135}_1
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ -p_804 ∨ -b^{6, 135}_0
c  in DIMACS:
 9527  9528 -9529 -804 -9530 0
 9527  9528 -9529 -804  9531 0
 9527  9528 -9529 -804 -9532 0

c  2+1 --> break 
c    (-b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧  p_804) -> break
c  in CNF:
c     b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 9527 -9528  9529 -804 1162 0


c  2-1 --> 1
c    (-b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧ -p_804) -> (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0)
c  in CNF:
c     b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_2
c     b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_1
c     b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨  b^{6, 135}_0
c  in DIMACS:
 9527 -9528  9529  804 -9530 0
 9527 -9528  9529  804 -9531 0
 9527 -9528  9529  804  9532 0

c  1-1 --> 0
c    (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0 ∧ -p_804) -> (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧ -b^{6, 135}_0)
c  in CNF:
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_2
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_1
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_0
c  in DIMACS:
 9527  9528 -9529  804 -9530 0
 9527  9528 -9529  804 -9531 0
 9527  9528 -9529  804 -9532 0

c  0-1 --> -1
c    (-b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧ -p_804) -> ( b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0)
c  in CNF:
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨  b^{6, 135}_2
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_1
c     b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨  b^{6, 135}_0
c  in DIMACS:
 9527  9528  9529  804  9530 0
 9527  9528  9529  804 -9531 0
 9527  9528  9529  804  9532 0

c  -1-1 --> -2
c    ( b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧  b^{6, 134}_0 ∧ -p_804) -> ( b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0)
c  in CNF:
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨  b^{6, 135}_2
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨  b^{6, 135}_1
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨  p_804 ∨ -b^{6, 135}_0
c  in DIMACS:
-9527  9528 -9529  804  9530 0
-9527  9528 -9529  804  9531 0
-9527  9528 -9529  804 -9532 0

c  -2-1 --> break 
c    ( b^{6, 134}_2 ∧  b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨  b^{6, 134}_0 ∨  p_804 ∨ break
c  in DIMACS:
-9527 -9528  9529  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 134}_2 ∧ -b^{6, 134}_1 ∧ -b^{6, 134}_0 ∧ true) 
c  in CNF:
c    -b^{6, 134}_2 ∨  b^{6, 134}_1 ∨  b^{6, 134}_0 ∨ false 
c  in DIMACS:
-9527  9528  9529  0

c  3 does not represent an automaton state.
c    -(-b^{6, 134}_2 ∧  b^{6, 134}_1 ∧  b^{6, 134}_0 ∧ true) 
c  in CNF:
c     b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ false 
c  in DIMACS:
 9527 -9528 -9529  0
c  -3 does not represent an automaton state.
c    -( b^{6, 134}_2 ∧  b^{6, 134}_1 ∧  b^{6, 134}_0 ∧ true) 
c  in CNF:
c    -b^{6, 134}_2 ∨ -b^{6, 134}_1 ∨ -b^{6, 134}_0 ∨ false 
c  in DIMACS:
-9527 -9528 -9529  0

c i = 135
c  -2+1 --> -1
c    ( b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧  p_810) -> ( b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0)
c  in CNF:
c    -b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨  b^{6, 136}_2
c    -b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_1
c    -b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨  b^{6, 136}_0
c  in DIMACS:
-9530 -9531  9532 -810  9533 0
-9530 -9531  9532 -810 -9534 0
-9530 -9531  9532 -810  9535 0

c  -1+1 --> 0
c    ( b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0 ∧  p_810) -> (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧ -b^{6, 136}_0)
c  in CNF:
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_2
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_1
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_0
c  in DIMACS:
-9530  9531 -9532 -810 -9533 0
-9530  9531 -9532 -810 -9534 0
-9530  9531 -9532 -810 -9535 0

c  0+1 --> 1
c    (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧  p_810) -> (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0)
c  in CNF:
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_2
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_1
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨  b^{6, 136}_0
c  in DIMACS:
 9530  9531  9532 -810 -9533 0
 9530  9531  9532 -810 -9534 0
 9530  9531  9532 -810  9535 0

c  1+1 --> 2
c    (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0 ∧  p_810) -> (-b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0)
c  in CNF:
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_2
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨  b^{6, 136}_1
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ -p_810 ∨ -b^{6, 136}_0
c  in DIMACS:
 9530  9531 -9532 -810 -9533 0
 9530  9531 -9532 -810  9534 0
 9530  9531 -9532 -810 -9535 0

c  2+1 --> break 
c    (-b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧  p_810) -> break
c  in CNF:
c     b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 9530 -9531  9532 -810 1162 0


c  2-1 --> 1
c    (-b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧ -p_810) -> (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0)
c  in CNF:
c     b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_2
c     b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_1
c     b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨  b^{6, 136}_0
c  in DIMACS:
 9530 -9531  9532  810 -9533 0
 9530 -9531  9532  810 -9534 0
 9530 -9531  9532  810  9535 0

c  1-1 --> 0
c    (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0 ∧ -p_810) -> (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧ -b^{6, 136}_0)
c  in CNF:
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_2
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_1
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_0
c  in DIMACS:
 9530  9531 -9532  810 -9533 0
 9530  9531 -9532  810 -9534 0
 9530  9531 -9532  810 -9535 0

c  0-1 --> -1
c    (-b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧ -p_810) -> ( b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0)
c  in CNF:
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨  b^{6, 136}_2
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_1
c     b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨  b^{6, 136}_0
c  in DIMACS:
 9530  9531  9532  810  9533 0
 9530  9531  9532  810 -9534 0
 9530  9531  9532  810  9535 0

c  -1-1 --> -2
c    ( b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧  b^{6, 135}_0 ∧ -p_810) -> ( b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0)
c  in CNF:
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨  b^{6, 136}_2
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨  b^{6, 136}_1
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨  p_810 ∨ -b^{6, 136}_0
c  in DIMACS:
-9530  9531 -9532  810  9533 0
-9530  9531 -9532  810  9534 0
-9530  9531 -9532  810 -9535 0

c  -2-1 --> break 
c    ( b^{6, 135}_2 ∧  b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨  b^{6, 135}_0 ∨  p_810 ∨ break
c  in DIMACS:
-9530 -9531  9532  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 135}_2 ∧ -b^{6, 135}_1 ∧ -b^{6, 135}_0 ∧ true) 
c  in CNF:
c    -b^{6, 135}_2 ∨  b^{6, 135}_1 ∨  b^{6, 135}_0 ∨ false 
c  in DIMACS:
-9530  9531  9532  0

c  3 does not represent an automaton state.
c    -(-b^{6, 135}_2 ∧  b^{6, 135}_1 ∧  b^{6, 135}_0 ∧ true) 
c  in CNF:
c     b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ false 
c  in DIMACS:
 9530 -9531 -9532  0
c  -3 does not represent an automaton state.
c    -( b^{6, 135}_2 ∧  b^{6, 135}_1 ∧  b^{6, 135}_0 ∧ true) 
c  in CNF:
c    -b^{6, 135}_2 ∨ -b^{6, 135}_1 ∨ -b^{6, 135}_0 ∨ false 
c  in DIMACS:
-9530 -9531 -9532  0

c i = 136
c  -2+1 --> -1
c    ( b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧  p_816) -> ( b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0)
c  in CNF:
c    -b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨  b^{6, 137}_2
c    -b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_1
c    -b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨  b^{6, 137}_0
c  in DIMACS:
-9533 -9534  9535 -816  9536 0
-9533 -9534  9535 -816 -9537 0
-9533 -9534  9535 -816  9538 0

c  -1+1 --> 0
c    ( b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0 ∧  p_816) -> (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧ -b^{6, 137}_0)
c  in CNF:
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_2
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_1
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_0
c  in DIMACS:
-9533  9534 -9535 -816 -9536 0
-9533  9534 -9535 -816 -9537 0
-9533  9534 -9535 -816 -9538 0

c  0+1 --> 1
c    (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧  p_816) -> (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0)
c  in CNF:
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_2
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_1
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨  b^{6, 137}_0
c  in DIMACS:
 9533  9534  9535 -816 -9536 0
 9533  9534  9535 -816 -9537 0
 9533  9534  9535 -816  9538 0

c  1+1 --> 2
c    (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0 ∧  p_816) -> (-b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0)
c  in CNF:
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_2
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨  b^{6, 137}_1
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ -p_816 ∨ -b^{6, 137}_0
c  in DIMACS:
 9533  9534 -9535 -816 -9536 0
 9533  9534 -9535 -816  9537 0
 9533  9534 -9535 -816 -9538 0

c  2+1 --> break 
c    (-b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧  p_816) -> break
c  in CNF:
c     b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 9533 -9534  9535 -816 1162 0


c  2-1 --> 1
c    (-b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧ -p_816) -> (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0)
c  in CNF:
c     b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_2
c     b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_1
c     b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨  b^{6, 137}_0
c  in DIMACS:
 9533 -9534  9535  816 -9536 0
 9533 -9534  9535  816 -9537 0
 9533 -9534  9535  816  9538 0

c  1-1 --> 0
c    (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0 ∧ -p_816) -> (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧ -b^{6, 137}_0)
c  in CNF:
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_2
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_1
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_0
c  in DIMACS:
 9533  9534 -9535  816 -9536 0
 9533  9534 -9535  816 -9537 0
 9533  9534 -9535  816 -9538 0

c  0-1 --> -1
c    (-b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧ -p_816) -> ( b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0)
c  in CNF:
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨  b^{6, 137}_2
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_1
c     b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨  b^{6, 137}_0
c  in DIMACS:
 9533  9534  9535  816  9536 0
 9533  9534  9535  816 -9537 0
 9533  9534  9535  816  9538 0

c  -1-1 --> -2
c    ( b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧  b^{6, 136}_0 ∧ -p_816) -> ( b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0)
c  in CNF:
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨  b^{6, 137}_2
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨  b^{6, 137}_1
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨  p_816 ∨ -b^{6, 137}_0
c  in DIMACS:
-9533  9534 -9535  816  9536 0
-9533  9534 -9535  816  9537 0
-9533  9534 -9535  816 -9538 0

c  -2-1 --> break 
c    ( b^{6, 136}_2 ∧  b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨  b^{6, 136}_0 ∨  p_816 ∨ break
c  in DIMACS:
-9533 -9534  9535  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 136}_2 ∧ -b^{6, 136}_1 ∧ -b^{6, 136}_0 ∧ true) 
c  in CNF:
c    -b^{6, 136}_2 ∨  b^{6, 136}_1 ∨  b^{6, 136}_0 ∨ false 
c  in DIMACS:
-9533  9534  9535  0

c  3 does not represent an automaton state.
c    -(-b^{6, 136}_2 ∧  b^{6, 136}_1 ∧  b^{6, 136}_0 ∧ true) 
c  in CNF:
c     b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ false 
c  in DIMACS:
 9533 -9534 -9535  0
c  -3 does not represent an automaton state.
c    -( b^{6, 136}_2 ∧  b^{6, 136}_1 ∧  b^{6, 136}_0 ∧ true) 
c  in CNF:
c    -b^{6, 136}_2 ∨ -b^{6, 136}_1 ∨ -b^{6, 136}_0 ∨ false 
c  in DIMACS:
-9533 -9534 -9535  0

c i = 137
c  -2+1 --> -1
c    ( b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧  p_822) -> ( b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0)
c  in CNF:
c    -b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨  b^{6, 138}_2
c    -b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_1
c    -b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨  b^{6, 138}_0
c  in DIMACS:
-9536 -9537  9538 -822  9539 0
-9536 -9537  9538 -822 -9540 0
-9536 -9537  9538 -822  9541 0

c  -1+1 --> 0
c    ( b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0 ∧  p_822) -> (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧ -b^{6, 138}_0)
c  in CNF:
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_2
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_1
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_0
c  in DIMACS:
-9536  9537 -9538 -822 -9539 0
-9536  9537 -9538 -822 -9540 0
-9536  9537 -9538 -822 -9541 0

c  0+1 --> 1
c    (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧  p_822) -> (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0)
c  in CNF:
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_2
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_1
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨  b^{6, 138}_0
c  in DIMACS:
 9536  9537  9538 -822 -9539 0
 9536  9537  9538 -822 -9540 0
 9536  9537  9538 -822  9541 0

c  1+1 --> 2
c    (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0 ∧  p_822) -> (-b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0)
c  in CNF:
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_2
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨  b^{6, 138}_1
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ -p_822 ∨ -b^{6, 138}_0
c  in DIMACS:
 9536  9537 -9538 -822 -9539 0
 9536  9537 -9538 -822  9540 0
 9536  9537 -9538 -822 -9541 0

c  2+1 --> break 
c    (-b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧  p_822) -> break
c  in CNF:
c     b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 9536 -9537  9538 -822 1162 0


c  2-1 --> 1
c    (-b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧ -p_822) -> (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0)
c  in CNF:
c     b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_2
c     b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_1
c     b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨  b^{6, 138}_0
c  in DIMACS:
 9536 -9537  9538  822 -9539 0
 9536 -9537  9538  822 -9540 0
 9536 -9537  9538  822  9541 0

c  1-1 --> 0
c    (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0 ∧ -p_822) -> (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧ -b^{6, 138}_0)
c  in CNF:
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_2
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_1
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_0
c  in DIMACS:
 9536  9537 -9538  822 -9539 0
 9536  9537 -9538  822 -9540 0
 9536  9537 -9538  822 -9541 0

c  0-1 --> -1
c    (-b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧ -p_822) -> ( b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0)
c  in CNF:
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨  b^{6, 138}_2
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_1
c     b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨  b^{6, 138}_0
c  in DIMACS:
 9536  9537  9538  822  9539 0
 9536  9537  9538  822 -9540 0
 9536  9537  9538  822  9541 0

c  -1-1 --> -2
c    ( b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧  b^{6, 137}_0 ∧ -p_822) -> ( b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0)
c  in CNF:
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨  b^{6, 138}_2
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨  b^{6, 138}_1
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨  p_822 ∨ -b^{6, 138}_0
c  in DIMACS:
-9536  9537 -9538  822  9539 0
-9536  9537 -9538  822  9540 0
-9536  9537 -9538  822 -9541 0

c  -2-1 --> break 
c    ( b^{6, 137}_2 ∧  b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨  b^{6, 137}_0 ∨  p_822 ∨ break
c  in DIMACS:
-9536 -9537  9538  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 137}_2 ∧ -b^{6, 137}_1 ∧ -b^{6, 137}_0 ∧ true) 
c  in CNF:
c    -b^{6, 137}_2 ∨  b^{6, 137}_1 ∨  b^{6, 137}_0 ∨ false 
c  in DIMACS:
-9536  9537  9538  0

c  3 does not represent an automaton state.
c    -(-b^{6, 137}_2 ∧  b^{6, 137}_1 ∧  b^{6, 137}_0 ∧ true) 
c  in CNF:
c     b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ false 
c  in DIMACS:
 9536 -9537 -9538  0
c  -3 does not represent an automaton state.
c    -( b^{6, 137}_2 ∧  b^{6, 137}_1 ∧  b^{6, 137}_0 ∧ true) 
c  in CNF:
c    -b^{6, 137}_2 ∨ -b^{6, 137}_1 ∨ -b^{6, 137}_0 ∨ false 
c  in DIMACS:
-9536 -9537 -9538  0

c i = 138
c  -2+1 --> -1
c    ( b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧  p_828) -> ( b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0)
c  in CNF:
c    -b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨  b^{6, 139}_2
c    -b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_1
c    -b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨  b^{6, 139}_0
c  in DIMACS:
-9539 -9540  9541 -828  9542 0
-9539 -9540  9541 -828 -9543 0
-9539 -9540  9541 -828  9544 0

c  -1+1 --> 0
c    ( b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0 ∧  p_828) -> (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧ -b^{6, 139}_0)
c  in CNF:
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_2
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_1
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_0
c  in DIMACS:
-9539  9540 -9541 -828 -9542 0
-9539  9540 -9541 -828 -9543 0
-9539  9540 -9541 -828 -9544 0

c  0+1 --> 1
c    (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧  p_828) -> (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0)
c  in CNF:
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_2
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_1
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨  b^{6, 139}_0
c  in DIMACS:
 9539  9540  9541 -828 -9542 0
 9539  9540  9541 -828 -9543 0
 9539  9540  9541 -828  9544 0

c  1+1 --> 2
c    (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0 ∧  p_828) -> (-b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0)
c  in CNF:
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_2
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨  b^{6, 139}_1
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ -p_828 ∨ -b^{6, 139}_0
c  in DIMACS:
 9539  9540 -9541 -828 -9542 0
 9539  9540 -9541 -828  9543 0
 9539  9540 -9541 -828 -9544 0

c  2+1 --> break 
c    (-b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧  p_828) -> break
c  in CNF:
c     b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 9539 -9540  9541 -828 1162 0


c  2-1 --> 1
c    (-b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧ -p_828) -> (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0)
c  in CNF:
c     b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_2
c     b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_1
c     b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨  b^{6, 139}_0
c  in DIMACS:
 9539 -9540  9541  828 -9542 0
 9539 -9540  9541  828 -9543 0
 9539 -9540  9541  828  9544 0

c  1-1 --> 0
c    (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0 ∧ -p_828) -> (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧ -b^{6, 139}_0)
c  in CNF:
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_2
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_1
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_0
c  in DIMACS:
 9539  9540 -9541  828 -9542 0
 9539  9540 -9541  828 -9543 0
 9539  9540 -9541  828 -9544 0

c  0-1 --> -1
c    (-b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧ -p_828) -> ( b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0)
c  in CNF:
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨  b^{6, 139}_2
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_1
c     b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨  b^{6, 139}_0
c  in DIMACS:
 9539  9540  9541  828  9542 0
 9539  9540  9541  828 -9543 0
 9539  9540  9541  828  9544 0

c  -1-1 --> -2
c    ( b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧  b^{6, 138}_0 ∧ -p_828) -> ( b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0)
c  in CNF:
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨  b^{6, 139}_2
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨  b^{6, 139}_1
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨  p_828 ∨ -b^{6, 139}_0
c  in DIMACS:
-9539  9540 -9541  828  9542 0
-9539  9540 -9541  828  9543 0
-9539  9540 -9541  828 -9544 0

c  -2-1 --> break 
c    ( b^{6, 138}_2 ∧  b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨  b^{6, 138}_0 ∨  p_828 ∨ break
c  in DIMACS:
-9539 -9540  9541  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 138}_2 ∧ -b^{6, 138}_1 ∧ -b^{6, 138}_0 ∧ true) 
c  in CNF:
c    -b^{6, 138}_2 ∨  b^{6, 138}_1 ∨  b^{6, 138}_0 ∨ false 
c  in DIMACS:
-9539  9540  9541  0

c  3 does not represent an automaton state.
c    -(-b^{6, 138}_2 ∧  b^{6, 138}_1 ∧  b^{6, 138}_0 ∧ true) 
c  in CNF:
c     b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ false 
c  in DIMACS:
 9539 -9540 -9541  0
c  -3 does not represent an automaton state.
c    -( b^{6, 138}_2 ∧  b^{6, 138}_1 ∧  b^{6, 138}_0 ∧ true) 
c  in CNF:
c    -b^{6, 138}_2 ∨ -b^{6, 138}_1 ∨ -b^{6, 138}_0 ∨ false 
c  in DIMACS:
-9539 -9540 -9541  0

c i = 139
c  -2+1 --> -1
c    ( b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧  p_834) -> ( b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0)
c  in CNF:
c    -b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨  b^{6, 140}_2
c    -b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_1
c    -b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨  b^{6, 140}_0
c  in DIMACS:
-9542 -9543  9544 -834  9545 0
-9542 -9543  9544 -834 -9546 0
-9542 -9543  9544 -834  9547 0

c  -1+1 --> 0
c    ( b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0 ∧  p_834) -> (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧ -b^{6, 140}_0)
c  in CNF:
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_2
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_1
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_0
c  in DIMACS:
-9542  9543 -9544 -834 -9545 0
-9542  9543 -9544 -834 -9546 0
-9542  9543 -9544 -834 -9547 0

c  0+1 --> 1
c    (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧  p_834) -> (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0)
c  in CNF:
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_2
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_1
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨  b^{6, 140}_0
c  in DIMACS:
 9542  9543  9544 -834 -9545 0
 9542  9543  9544 -834 -9546 0
 9542  9543  9544 -834  9547 0

c  1+1 --> 2
c    (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0 ∧  p_834) -> (-b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0)
c  in CNF:
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_2
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨  b^{6, 140}_1
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ -p_834 ∨ -b^{6, 140}_0
c  in DIMACS:
 9542  9543 -9544 -834 -9545 0
 9542  9543 -9544 -834  9546 0
 9542  9543 -9544 -834 -9547 0

c  2+1 --> break 
c    (-b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧  p_834) -> break
c  in CNF:
c     b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 9542 -9543  9544 -834 1162 0


c  2-1 --> 1
c    (-b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧ -p_834) -> (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0)
c  in CNF:
c     b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_2
c     b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_1
c     b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨  b^{6, 140}_0
c  in DIMACS:
 9542 -9543  9544  834 -9545 0
 9542 -9543  9544  834 -9546 0
 9542 -9543  9544  834  9547 0

c  1-1 --> 0
c    (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0 ∧ -p_834) -> (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧ -b^{6, 140}_0)
c  in CNF:
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_2
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_1
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_0
c  in DIMACS:
 9542  9543 -9544  834 -9545 0
 9542  9543 -9544  834 -9546 0
 9542  9543 -9544  834 -9547 0

c  0-1 --> -1
c    (-b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧ -p_834) -> ( b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0)
c  in CNF:
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨  b^{6, 140}_2
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_1
c     b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨  b^{6, 140}_0
c  in DIMACS:
 9542  9543  9544  834  9545 0
 9542  9543  9544  834 -9546 0
 9542  9543  9544  834  9547 0

c  -1-1 --> -2
c    ( b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧  b^{6, 139}_0 ∧ -p_834) -> ( b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0)
c  in CNF:
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨  b^{6, 140}_2
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨  b^{6, 140}_1
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨  p_834 ∨ -b^{6, 140}_0
c  in DIMACS:
-9542  9543 -9544  834  9545 0
-9542  9543 -9544  834  9546 0
-9542  9543 -9544  834 -9547 0

c  -2-1 --> break 
c    ( b^{6, 139}_2 ∧  b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨  b^{6, 139}_0 ∨  p_834 ∨ break
c  in DIMACS:
-9542 -9543  9544  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 139}_2 ∧ -b^{6, 139}_1 ∧ -b^{6, 139}_0 ∧ true) 
c  in CNF:
c    -b^{6, 139}_2 ∨  b^{6, 139}_1 ∨  b^{6, 139}_0 ∨ false 
c  in DIMACS:
-9542  9543  9544  0

c  3 does not represent an automaton state.
c    -(-b^{6, 139}_2 ∧  b^{6, 139}_1 ∧  b^{6, 139}_0 ∧ true) 
c  in CNF:
c     b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ false 
c  in DIMACS:
 9542 -9543 -9544  0
c  -3 does not represent an automaton state.
c    -( b^{6, 139}_2 ∧  b^{6, 139}_1 ∧  b^{6, 139}_0 ∧ true) 
c  in CNF:
c    -b^{6, 139}_2 ∨ -b^{6, 139}_1 ∨ -b^{6, 139}_0 ∨ false 
c  in DIMACS:
-9542 -9543 -9544  0

c i = 140
c  -2+1 --> -1
c    ( b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧  p_840) -> ( b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0)
c  in CNF:
c    -b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨  b^{6, 141}_2
c    -b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_1
c    -b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨  b^{6, 141}_0
c  in DIMACS:
-9545 -9546  9547 -840  9548 0
-9545 -9546  9547 -840 -9549 0
-9545 -9546  9547 -840  9550 0

c  -1+1 --> 0
c    ( b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0 ∧  p_840) -> (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧ -b^{6, 141}_0)
c  in CNF:
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_2
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_1
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_0
c  in DIMACS:
-9545  9546 -9547 -840 -9548 0
-9545  9546 -9547 -840 -9549 0
-9545  9546 -9547 -840 -9550 0

c  0+1 --> 1
c    (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧  p_840) -> (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0)
c  in CNF:
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_2
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_1
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨  b^{6, 141}_0
c  in DIMACS:
 9545  9546  9547 -840 -9548 0
 9545  9546  9547 -840 -9549 0
 9545  9546  9547 -840  9550 0

c  1+1 --> 2
c    (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0 ∧  p_840) -> (-b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0)
c  in CNF:
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_2
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨  b^{6, 141}_1
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ -p_840 ∨ -b^{6, 141}_0
c  in DIMACS:
 9545  9546 -9547 -840 -9548 0
 9545  9546 -9547 -840  9549 0
 9545  9546 -9547 -840 -9550 0

c  2+1 --> break 
c    (-b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧  p_840) -> break
c  in CNF:
c     b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 9545 -9546  9547 -840 1162 0


c  2-1 --> 1
c    (-b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧ -p_840) -> (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0)
c  in CNF:
c     b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_2
c     b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_1
c     b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨  b^{6, 141}_0
c  in DIMACS:
 9545 -9546  9547  840 -9548 0
 9545 -9546  9547  840 -9549 0
 9545 -9546  9547  840  9550 0

c  1-1 --> 0
c    (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0 ∧ -p_840) -> (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧ -b^{6, 141}_0)
c  in CNF:
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_2
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_1
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_0
c  in DIMACS:
 9545  9546 -9547  840 -9548 0
 9545  9546 -9547  840 -9549 0
 9545  9546 -9547  840 -9550 0

c  0-1 --> -1
c    (-b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧ -p_840) -> ( b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0)
c  in CNF:
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨  b^{6, 141}_2
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_1
c     b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨  b^{6, 141}_0
c  in DIMACS:
 9545  9546  9547  840  9548 0
 9545  9546  9547  840 -9549 0
 9545  9546  9547  840  9550 0

c  -1-1 --> -2
c    ( b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧  b^{6, 140}_0 ∧ -p_840) -> ( b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0)
c  in CNF:
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨  b^{6, 141}_2
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨  b^{6, 141}_1
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨  p_840 ∨ -b^{6, 141}_0
c  in DIMACS:
-9545  9546 -9547  840  9548 0
-9545  9546 -9547  840  9549 0
-9545  9546 -9547  840 -9550 0

c  -2-1 --> break 
c    ( b^{6, 140}_2 ∧  b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨  b^{6, 140}_0 ∨  p_840 ∨ break
c  in DIMACS:
-9545 -9546  9547  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 140}_2 ∧ -b^{6, 140}_1 ∧ -b^{6, 140}_0 ∧ true) 
c  in CNF:
c    -b^{6, 140}_2 ∨  b^{6, 140}_1 ∨  b^{6, 140}_0 ∨ false 
c  in DIMACS:
-9545  9546  9547  0

c  3 does not represent an automaton state.
c    -(-b^{6, 140}_2 ∧  b^{6, 140}_1 ∧  b^{6, 140}_0 ∧ true) 
c  in CNF:
c     b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ false 
c  in DIMACS:
 9545 -9546 -9547  0
c  -3 does not represent an automaton state.
c    -( b^{6, 140}_2 ∧  b^{6, 140}_1 ∧  b^{6, 140}_0 ∧ true) 
c  in CNF:
c    -b^{6, 140}_2 ∨ -b^{6, 140}_1 ∨ -b^{6, 140}_0 ∨ false 
c  in DIMACS:
-9545 -9546 -9547  0

c i = 141
c  -2+1 --> -1
c    ( b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧  p_846) -> ( b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0)
c  in CNF:
c    -b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨  b^{6, 142}_2
c    -b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_1
c    -b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨  b^{6, 142}_0
c  in DIMACS:
-9548 -9549  9550 -846  9551 0
-9548 -9549  9550 -846 -9552 0
-9548 -9549  9550 -846  9553 0

c  -1+1 --> 0
c    ( b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0 ∧  p_846) -> (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧ -b^{6, 142}_0)
c  in CNF:
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_2
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_1
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_0
c  in DIMACS:
-9548  9549 -9550 -846 -9551 0
-9548  9549 -9550 -846 -9552 0
-9548  9549 -9550 -846 -9553 0

c  0+1 --> 1
c    (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧  p_846) -> (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0)
c  in CNF:
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_2
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_1
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨  b^{6, 142}_0
c  in DIMACS:
 9548  9549  9550 -846 -9551 0
 9548  9549  9550 -846 -9552 0
 9548  9549  9550 -846  9553 0

c  1+1 --> 2
c    (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0 ∧  p_846) -> (-b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0)
c  in CNF:
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_2
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨  b^{6, 142}_1
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ -p_846 ∨ -b^{6, 142}_0
c  in DIMACS:
 9548  9549 -9550 -846 -9551 0
 9548  9549 -9550 -846  9552 0
 9548  9549 -9550 -846 -9553 0

c  2+1 --> break 
c    (-b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧  p_846) -> break
c  in CNF:
c     b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 9548 -9549  9550 -846 1162 0


c  2-1 --> 1
c    (-b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧ -p_846) -> (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0)
c  in CNF:
c     b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_2
c     b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_1
c     b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨  b^{6, 142}_0
c  in DIMACS:
 9548 -9549  9550  846 -9551 0
 9548 -9549  9550  846 -9552 0
 9548 -9549  9550  846  9553 0

c  1-1 --> 0
c    (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0 ∧ -p_846) -> (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧ -b^{6, 142}_0)
c  in CNF:
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_2
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_1
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_0
c  in DIMACS:
 9548  9549 -9550  846 -9551 0
 9548  9549 -9550  846 -9552 0
 9548  9549 -9550  846 -9553 0

c  0-1 --> -1
c    (-b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧ -p_846) -> ( b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0)
c  in CNF:
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨  b^{6, 142}_2
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_1
c     b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨  b^{6, 142}_0
c  in DIMACS:
 9548  9549  9550  846  9551 0
 9548  9549  9550  846 -9552 0
 9548  9549  9550  846  9553 0

c  -1-1 --> -2
c    ( b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧  b^{6, 141}_0 ∧ -p_846) -> ( b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0)
c  in CNF:
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨  b^{6, 142}_2
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨  b^{6, 142}_1
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨  p_846 ∨ -b^{6, 142}_0
c  in DIMACS:
-9548  9549 -9550  846  9551 0
-9548  9549 -9550  846  9552 0
-9548  9549 -9550  846 -9553 0

c  -2-1 --> break 
c    ( b^{6, 141}_2 ∧  b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨  b^{6, 141}_0 ∨  p_846 ∨ break
c  in DIMACS:
-9548 -9549  9550  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 141}_2 ∧ -b^{6, 141}_1 ∧ -b^{6, 141}_0 ∧ true) 
c  in CNF:
c    -b^{6, 141}_2 ∨  b^{6, 141}_1 ∨  b^{6, 141}_0 ∨ false 
c  in DIMACS:
-9548  9549  9550  0

c  3 does not represent an automaton state.
c    -(-b^{6, 141}_2 ∧  b^{6, 141}_1 ∧  b^{6, 141}_0 ∧ true) 
c  in CNF:
c     b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ false 
c  in DIMACS:
 9548 -9549 -9550  0
c  -3 does not represent an automaton state.
c    -( b^{6, 141}_2 ∧  b^{6, 141}_1 ∧  b^{6, 141}_0 ∧ true) 
c  in CNF:
c    -b^{6, 141}_2 ∨ -b^{6, 141}_1 ∨ -b^{6, 141}_0 ∨ false 
c  in DIMACS:
-9548 -9549 -9550  0

c i = 142
c  -2+1 --> -1
c    ( b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧  p_852) -> ( b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0)
c  in CNF:
c    -b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨  b^{6, 143}_2
c    -b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_1
c    -b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨  b^{6, 143}_0
c  in DIMACS:
-9551 -9552  9553 -852  9554 0
-9551 -9552  9553 -852 -9555 0
-9551 -9552  9553 -852  9556 0

c  -1+1 --> 0
c    ( b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0 ∧  p_852) -> (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧ -b^{6, 143}_0)
c  in CNF:
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_2
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_1
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_0
c  in DIMACS:
-9551  9552 -9553 -852 -9554 0
-9551  9552 -9553 -852 -9555 0
-9551  9552 -9553 -852 -9556 0

c  0+1 --> 1
c    (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧  p_852) -> (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0)
c  in CNF:
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_2
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_1
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨  b^{6, 143}_0
c  in DIMACS:
 9551  9552  9553 -852 -9554 0
 9551  9552  9553 -852 -9555 0
 9551  9552  9553 -852  9556 0

c  1+1 --> 2
c    (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0 ∧  p_852) -> (-b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0)
c  in CNF:
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_2
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨  b^{6, 143}_1
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ -p_852 ∨ -b^{6, 143}_0
c  in DIMACS:
 9551  9552 -9553 -852 -9554 0
 9551  9552 -9553 -852  9555 0
 9551  9552 -9553 -852 -9556 0

c  2+1 --> break 
c    (-b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧  p_852) -> break
c  in CNF:
c     b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 9551 -9552  9553 -852 1162 0


c  2-1 --> 1
c    (-b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧ -p_852) -> (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0)
c  in CNF:
c     b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_2
c     b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_1
c     b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨  b^{6, 143}_0
c  in DIMACS:
 9551 -9552  9553  852 -9554 0
 9551 -9552  9553  852 -9555 0
 9551 -9552  9553  852  9556 0

c  1-1 --> 0
c    (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0 ∧ -p_852) -> (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧ -b^{6, 143}_0)
c  in CNF:
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_2
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_1
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_0
c  in DIMACS:
 9551  9552 -9553  852 -9554 0
 9551  9552 -9553  852 -9555 0
 9551  9552 -9553  852 -9556 0

c  0-1 --> -1
c    (-b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧ -p_852) -> ( b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0)
c  in CNF:
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨  b^{6, 143}_2
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_1
c     b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨  b^{6, 143}_0
c  in DIMACS:
 9551  9552  9553  852  9554 0
 9551  9552  9553  852 -9555 0
 9551  9552  9553  852  9556 0

c  -1-1 --> -2
c    ( b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧  b^{6, 142}_0 ∧ -p_852) -> ( b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0)
c  in CNF:
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨  b^{6, 143}_2
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨  b^{6, 143}_1
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨  p_852 ∨ -b^{6, 143}_0
c  in DIMACS:
-9551  9552 -9553  852  9554 0
-9551  9552 -9553  852  9555 0
-9551  9552 -9553  852 -9556 0

c  -2-1 --> break 
c    ( b^{6, 142}_2 ∧  b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨  b^{6, 142}_0 ∨  p_852 ∨ break
c  in DIMACS:
-9551 -9552  9553  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 142}_2 ∧ -b^{6, 142}_1 ∧ -b^{6, 142}_0 ∧ true) 
c  in CNF:
c    -b^{6, 142}_2 ∨  b^{6, 142}_1 ∨  b^{6, 142}_0 ∨ false 
c  in DIMACS:
-9551  9552  9553  0

c  3 does not represent an automaton state.
c    -(-b^{6, 142}_2 ∧  b^{6, 142}_1 ∧  b^{6, 142}_0 ∧ true) 
c  in CNF:
c     b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ false 
c  in DIMACS:
 9551 -9552 -9553  0
c  -3 does not represent an automaton state.
c    -( b^{6, 142}_2 ∧  b^{6, 142}_1 ∧  b^{6, 142}_0 ∧ true) 
c  in CNF:
c    -b^{6, 142}_2 ∨ -b^{6, 142}_1 ∨ -b^{6, 142}_0 ∨ false 
c  in DIMACS:
-9551 -9552 -9553  0

c i = 143
c  -2+1 --> -1
c    ( b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧  p_858) -> ( b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0)
c  in CNF:
c    -b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨  b^{6, 144}_2
c    -b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_1
c    -b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨  b^{6, 144}_0
c  in DIMACS:
-9554 -9555  9556 -858  9557 0
-9554 -9555  9556 -858 -9558 0
-9554 -9555  9556 -858  9559 0

c  -1+1 --> 0
c    ( b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0 ∧  p_858) -> (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧ -b^{6, 144}_0)
c  in CNF:
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_2
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_1
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_0
c  in DIMACS:
-9554  9555 -9556 -858 -9557 0
-9554  9555 -9556 -858 -9558 0
-9554  9555 -9556 -858 -9559 0

c  0+1 --> 1
c    (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧  p_858) -> (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0)
c  in CNF:
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_2
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_1
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨  b^{6, 144}_0
c  in DIMACS:
 9554  9555  9556 -858 -9557 0
 9554  9555  9556 -858 -9558 0
 9554  9555  9556 -858  9559 0

c  1+1 --> 2
c    (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0 ∧  p_858) -> (-b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0)
c  in CNF:
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_2
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨  b^{6, 144}_1
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ -p_858 ∨ -b^{6, 144}_0
c  in DIMACS:
 9554  9555 -9556 -858 -9557 0
 9554  9555 -9556 -858  9558 0
 9554  9555 -9556 -858 -9559 0

c  2+1 --> break 
c    (-b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧  p_858) -> break
c  in CNF:
c     b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 9554 -9555  9556 -858 1162 0


c  2-1 --> 1
c    (-b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧ -p_858) -> (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0)
c  in CNF:
c     b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_2
c     b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_1
c     b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨  b^{6, 144}_0
c  in DIMACS:
 9554 -9555  9556  858 -9557 0
 9554 -9555  9556  858 -9558 0
 9554 -9555  9556  858  9559 0

c  1-1 --> 0
c    (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0 ∧ -p_858) -> (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧ -b^{6, 144}_0)
c  in CNF:
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_2
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_1
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_0
c  in DIMACS:
 9554  9555 -9556  858 -9557 0
 9554  9555 -9556  858 -9558 0
 9554  9555 -9556  858 -9559 0

c  0-1 --> -1
c    (-b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧ -p_858) -> ( b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0)
c  in CNF:
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨  b^{6, 144}_2
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_1
c     b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨  b^{6, 144}_0
c  in DIMACS:
 9554  9555  9556  858  9557 0
 9554  9555  9556  858 -9558 0
 9554  9555  9556  858  9559 0

c  -1-1 --> -2
c    ( b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧  b^{6, 143}_0 ∧ -p_858) -> ( b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0)
c  in CNF:
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨  b^{6, 144}_2
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨  b^{6, 144}_1
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨  p_858 ∨ -b^{6, 144}_0
c  in DIMACS:
-9554  9555 -9556  858  9557 0
-9554  9555 -9556  858  9558 0
-9554  9555 -9556  858 -9559 0

c  -2-1 --> break 
c    ( b^{6, 143}_2 ∧  b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨  b^{6, 143}_0 ∨  p_858 ∨ break
c  in DIMACS:
-9554 -9555  9556  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 143}_2 ∧ -b^{6, 143}_1 ∧ -b^{6, 143}_0 ∧ true) 
c  in CNF:
c    -b^{6, 143}_2 ∨  b^{6, 143}_1 ∨  b^{6, 143}_0 ∨ false 
c  in DIMACS:
-9554  9555  9556  0

c  3 does not represent an automaton state.
c    -(-b^{6, 143}_2 ∧  b^{6, 143}_1 ∧  b^{6, 143}_0 ∧ true) 
c  in CNF:
c     b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ false 
c  in DIMACS:
 9554 -9555 -9556  0
c  -3 does not represent an automaton state.
c    -( b^{6, 143}_2 ∧  b^{6, 143}_1 ∧  b^{6, 143}_0 ∧ true) 
c  in CNF:
c    -b^{6, 143}_2 ∨ -b^{6, 143}_1 ∨ -b^{6, 143}_0 ∨ false 
c  in DIMACS:
-9554 -9555 -9556  0

c i = 144
c  -2+1 --> -1
c    ( b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧  p_864) -> ( b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0)
c  in CNF:
c    -b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨  b^{6, 145}_2
c    -b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_1
c    -b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨  b^{6, 145}_0
c  in DIMACS:
-9557 -9558  9559 -864  9560 0
-9557 -9558  9559 -864 -9561 0
-9557 -9558  9559 -864  9562 0

c  -1+1 --> 0
c    ( b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0 ∧  p_864) -> (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧ -b^{6, 145}_0)
c  in CNF:
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_2
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_1
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_0
c  in DIMACS:
-9557  9558 -9559 -864 -9560 0
-9557  9558 -9559 -864 -9561 0
-9557  9558 -9559 -864 -9562 0

c  0+1 --> 1
c    (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧  p_864) -> (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0)
c  in CNF:
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_2
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_1
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨  b^{6, 145}_0
c  in DIMACS:
 9557  9558  9559 -864 -9560 0
 9557  9558  9559 -864 -9561 0
 9557  9558  9559 -864  9562 0

c  1+1 --> 2
c    (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0 ∧  p_864) -> (-b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0)
c  in CNF:
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_2
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨  b^{6, 145}_1
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ -p_864 ∨ -b^{6, 145}_0
c  in DIMACS:
 9557  9558 -9559 -864 -9560 0
 9557  9558 -9559 -864  9561 0
 9557  9558 -9559 -864 -9562 0

c  2+1 --> break 
c    (-b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧  p_864) -> break
c  in CNF:
c     b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 9557 -9558  9559 -864 1162 0


c  2-1 --> 1
c    (-b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧ -p_864) -> (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0)
c  in CNF:
c     b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_2
c     b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_1
c     b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨  b^{6, 145}_0
c  in DIMACS:
 9557 -9558  9559  864 -9560 0
 9557 -9558  9559  864 -9561 0
 9557 -9558  9559  864  9562 0

c  1-1 --> 0
c    (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0 ∧ -p_864) -> (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧ -b^{6, 145}_0)
c  in CNF:
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_2
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_1
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_0
c  in DIMACS:
 9557  9558 -9559  864 -9560 0
 9557  9558 -9559  864 -9561 0
 9557  9558 -9559  864 -9562 0

c  0-1 --> -1
c    (-b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧ -p_864) -> ( b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0)
c  in CNF:
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨  b^{6, 145}_2
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_1
c     b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨  b^{6, 145}_0
c  in DIMACS:
 9557  9558  9559  864  9560 0
 9557  9558  9559  864 -9561 0
 9557  9558  9559  864  9562 0

c  -1-1 --> -2
c    ( b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧  b^{6, 144}_0 ∧ -p_864) -> ( b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0)
c  in CNF:
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨  b^{6, 145}_2
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨  b^{6, 145}_1
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨  p_864 ∨ -b^{6, 145}_0
c  in DIMACS:
-9557  9558 -9559  864  9560 0
-9557  9558 -9559  864  9561 0
-9557  9558 -9559  864 -9562 0

c  -2-1 --> break 
c    ( b^{6, 144}_2 ∧  b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨  b^{6, 144}_0 ∨  p_864 ∨ break
c  in DIMACS:
-9557 -9558  9559  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 144}_2 ∧ -b^{6, 144}_1 ∧ -b^{6, 144}_0 ∧ true) 
c  in CNF:
c    -b^{6, 144}_2 ∨  b^{6, 144}_1 ∨  b^{6, 144}_0 ∨ false 
c  in DIMACS:
-9557  9558  9559  0

c  3 does not represent an automaton state.
c    -(-b^{6, 144}_2 ∧  b^{6, 144}_1 ∧  b^{6, 144}_0 ∧ true) 
c  in CNF:
c     b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ false 
c  in DIMACS:
 9557 -9558 -9559  0
c  -3 does not represent an automaton state.
c    -( b^{6, 144}_2 ∧  b^{6, 144}_1 ∧  b^{6, 144}_0 ∧ true) 
c  in CNF:
c    -b^{6, 144}_2 ∨ -b^{6, 144}_1 ∨ -b^{6, 144}_0 ∨ false 
c  in DIMACS:
-9557 -9558 -9559  0

c i = 145
c  -2+1 --> -1
c    ( b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧  p_870) -> ( b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0)
c  in CNF:
c    -b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨  b^{6, 146}_2
c    -b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_1
c    -b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨  b^{6, 146}_0
c  in DIMACS:
-9560 -9561  9562 -870  9563 0
-9560 -9561  9562 -870 -9564 0
-9560 -9561  9562 -870  9565 0

c  -1+1 --> 0
c    ( b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0 ∧  p_870) -> (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧ -b^{6, 146}_0)
c  in CNF:
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_2
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_1
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_0
c  in DIMACS:
-9560  9561 -9562 -870 -9563 0
-9560  9561 -9562 -870 -9564 0
-9560  9561 -9562 -870 -9565 0

c  0+1 --> 1
c    (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧  p_870) -> (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0)
c  in CNF:
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_2
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_1
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨  b^{6, 146}_0
c  in DIMACS:
 9560  9561  9562 -870 -9563 0
 9560  9561  9562 -870 -9564 0
 9560  9561  9562 -870  9565 0

c  1+1 --> 2
c    (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0 ∧  p_870) -> (-b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0)
c  in CNF:
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_2
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨  b^{6, 146}_1
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ -p_870 ∨ -b^{6, 146}_0
c  in DIMACS:
 9560  9561 -9562 -870 -9563 0
 9560  9561 -9562 -870  9564 0
 9560  9561 -9562 -870 -9565 0

c  2+1 --> break 
c    (-b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧  p_870) -> break
c  in CNF:
c     b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 9560 -9561  9562 -870 1162 0


c  2-1 --> 1
c    (-b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧ -p_870) -> (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0)
c  in CNF:
c     b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_2
c     b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_1
c     b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨  b^{6, 146}_0
c  in DIMACS:
 9560 -9561  9562  870 -9563 0
 9560 -9561  9562  870 -9564 0
 9560 -9561  9562  870  9565 0

c  1-1 --> 0
c    (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0 ∧ -p_870) -> (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧ -b^{6, 146}_0)
c  in CNF:
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_2
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_1
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_0
c  in DIMACS:
 9560  9561 -9562  870 -9563 0
 9560  9561 -9562  870 -9564 0
 9560  9561 -9562  870 -9565 0

c  0-1 --> -1
c    (-b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧ -p_870) -> ( b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0)
c  in CNF:
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨  b^{6, 146}_2
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_1
c     b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨  b^{6, 146}_0
c  in DIMACS:
 9560  9561  9562  870  9563 0
 9560  9561  9562  870 -9564 0
 9560  9561  9562  870  9565 0

c  -1-1 --> -2
c    ( b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧  b^{6, 145}_0 ∧ -p_870) -> ( b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0)
c  in CNF:
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨  b^{6, 146}_2
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨  b^{6, 146}_1
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨  p_870 ∨ -b^{6, 146}_0
c  in DIMACS:
-9560  9561 -9562  870  9563 0
-9560  9561 -9562  870  9564 0
-9560  9561 -9562  870 -9565 0

c  -2-1 --> break 
c    ( b^{6, 145}_2 ∧  b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨  b^{6, 145}_0 ∨  p_870 ∨ break
c  in DIMACS:
-9560 -9561  9562  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 145}_2 ∧ -b^{6, 145}_1 ∧ -b^{6, 145}_0 ∧ true) 
c  in CNF:
c    -b^{6, 145}_2 ∨  b^{6, 145}_1 ∨  b^{6, 145}_0 ∨ false 
c  in DIMACS:
-9560  9561  9562  0

c  3 does not represent an automaton state.
c    -(-b^{6, 145}_2 ∧  b^{6, 145}_1 ∧  b^{6, 145}_0 ∧ true) 
c  in CNF:
c     b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ false 
c  in DIMACS:
 9560 -9561 -9562  0
c  -3 does not represent an automaton state.
c    -( b^{6, 145}_2 ∧  b^{6, 145}_1 ∧  b^{6, 145}_0 ∧ true) 
c  in CNF:
c    -b^{6, 145}_2 ∨ -b^{6, 145}_1 ∨ -b^{6, 145}_0 ∨ false 
c  in DIMACS:
-9560 -9561 -9562  0

c i = 146
c  -2+1 --> -1
c    ( b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧  p_876) -> ( b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0)
c  in CNF:
c    -b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨  b^{6, 147}_2
c    -b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_1
c    -b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨  b^{6, 147}_0
c  in DIMACS:
-9563 -9564  9565 -876  9566 0
-9563 -9564  9565 -876 -9567 0
-9563 -9564  9565 -876  9568 0

c  -1+1 --> 0
c    ( b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0 ∧  p_876) -> (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧ -b^{6, 147}_0)
c  in CNF:
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_2
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_1
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_0
c  in DIMACS:
-9563  9564 -9565 -876 -9566 0
-9563  9564 -9565 -876 -9567 0
-9563  9564 -9565 -876 -9568 0

c  0+1 --> 1
c    (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧  p_876) -> (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0)
c  in CNF:
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_2
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_1
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨  b^{6, 147}_0
c  in DIMACS:
 9563  9564  9565 -876 -9566 0
 9563  9564  9565 -876 -9567 0
 9563  9564  9565 -876  9568 0

c  1+1 --> 2
c    (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0 ∧  p_876) -> (-b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0)
c  in CNF:
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_2
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨  b^{6, 147}_1
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ -p_876 ∨ -b^{6, 147}_0
c  in DIMACS:
 9563  9564 -9565 -876 -9566 0
 9563  9564 -9565 -876  9567 0
 9563  9564 -9565 -876 -9568 0

c  2+1 --> break 
c    (-b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧  p_876) -> break
c  in CNF:
c     b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 9563 -9564  9565 -876 1162 0


c  2-1 --> 1
c    (-b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧ -p_876) -> (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0)
c  in CNF:
c     b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_2
c     b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_1
c     b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨  b^{6, 147}_0
c  in DIMACS:
 9563 -9564  9565  876 -9566 0
 9563 -9564  9565  876 -9567 0
 9563 -9564  9565  876  9568 0

c  1-1 --> 0
c    (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0 ∧ -p_876) -> (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧ -b^{6, 147}_0)
c  in CNF:
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_2
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_1
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_0
c  in DIMACS:
 9563  9564 -9565  876 -9566 0
 9563  9564 -9565  876 -9567 0
 9563  9564 -9565  876 -9568 0

c  0-1 --> -1
c    (-b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧ -p_876) -> ( b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0)
c  in CNF:
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨  b^{6, 147}_2
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_1
c     b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨  b^{6, 147}_0
c  in DIMACS:
 9563  9564  9565  876  9566 0
 9563  9564  9565  876 -9567 0
 9563  9564  9565  876  9568 0

c  -1-1 --> -2
c    ( b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧  b^{6, 146}_0 ∧ -p_876) -> ( b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0)
c  in CNF:
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨  b^{6, 147}_2
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨  b^{6, 147}_1
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨  p_876 ∨ -b^{6, 147}_0
c  in DIMACS:
-9563  9564 -9565  876  9566 0
-9563  9564 -9565  876  9567 0
-9563  9564 -9565  876 -9568 0

c  -2-1 --> break 
c    ( b^{6, 146}_2 ∧  b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨  b^{6, 146}_0 ∨  p_876 ∨ break
c  in DIMACS:
-9563 -9564  9565  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 146}_2 ∧ -b^{6, 146}_1 ∧ -b^{6, 146}_0 ∧ true) 
c  in CNF:
c    -b^{6, 146}_2 ∨  b^{6, 146}_1 ∨  b^{6, 146}_0 ∨ false 
c  in DIMACS:
-9563  9564  9565  0

c  3 does not represent an automaton state.
c    -(-b^{6, 146}_2 ∧  b^{6, 146}_1 ∧  b^{6, 146}_0 ∧ true) 
c  in CNF:
c     b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ false 
c  in DIMACS:
 9563 -9564 -9565  0
c  -3 does not represent an automaton state.
c    -( b^{6, 146}_2 ∧  b^{6, 146}_1 ∧  b^{6, 146}_0 ∧ true) 
c  in CNF:
c    -b^{6, 146}_2 ∨ -b^{6, 146}_1 ∨ -b^{6, 146}_0 ∨ false 
c  in DIMACS:
-9563 -9564 -9565  0

c i = 147
c  -2+1 --> -1
c    ( b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧  p_882) -> ( b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0)
c  in CNF:
c    -b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨  b^{6, 148}_2
c    -b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_1
c    -b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨  b^{6, 148}_0
c  in DIMACS:
-9566 -9567  9568 -882  9569 0
-9566 -9567  9568 -882 -9570 0
-9566 -9567  9568 -882  9571 0

c  -1+1 --> 0
c    ( b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0 ∧  p_882) -> (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧ -b^{6, 148}_0)
c  in CNF:
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_2
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_1
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_0
c  in DIMACS:
-9566  9567 -9568 -882 -9569 0
-9566  9567 -9568 -882 -9570 0
-9566  9567 -9568 -882 -9571 0

c  0+1 --> 1
c    (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧  p_882) -> (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0)
c  in CNF:
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_2
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_1
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨  b^{6, 148}_0
c  in DIMACS:
 9566  9567  9568 -882 -9569 0
 9566  9567  9568 -882 -9570 0
 9566  9567  9568 -882  9571 0

c  1+1 --> 2
c    (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0 ∧  p_882) -> (-b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0)
c  in CNF:
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_2
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨  b^{6, 148}_1
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ -p_882 ∨ -b^{6, 148}_0
c  in DIMACS:
 9566  9567 -9568 -882 -9569 0
 9566  9567 -9568 -882  9570 0
 9566  9567 -9568 -882 -9571 0

c  2+1 --> break 
c    (-b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧  p_882) -> break
c  in CNF:
c     b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 9566 -9567  9568 -882 1162 0


c  2-1 --> 1
c    (-b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧ -p_882) -> (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0)
c  in CNF:
c     b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_2
c     b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_1
c     b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨  b^{6, 148}_0
c  in DIMACS:
 9566 -9567  9568  882 -9569 0
 9566 -9567  9568  882 -9570 0
 9566 -9567  9568  882  9571 0

c  1-1 --> 0
c    (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0 ∧ -p_882) -> (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧ -b^{6, 148}_0)
c  in CNF:
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_2
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_1
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_0
c  in DIMACS:
 9566  9567 -9568  882 -9569 0
 9566  9567 -9568  882 -9570 0
 9566  9567 -9568  882 -9571 0

c  0-1 --> -1
c    (-b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧ -p_882) -> ( b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0)
c  in CNF:
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨  b^{6, 148}_2
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_1
c     b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨  b^{6, 148}_0
c  in DIMACS:
 9566  9567  9568  882  9569 0
 9566  9567  9568  882 -9570 0
 9566  9567  9568  882  9571 0

c  -1-1 --> -2
c    ( b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧  b^{6, 147}_0 ∧ -p_882) -> ( b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0)
c  in CNF:
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨  b^{6, 148}_2
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨  b^{6, 148}_1
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨  p_882 ∨ -b^{6, 148}_0
c  in DIMACS:
-9566  9567 -9568  882  9569 0
-9566  9567 -9568  882  9570 0
-9566  9567 -9568  882 -9571 0

c  -2-1 --> break 
c    ( b^{6, 147}_2 ∧  b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨  b^{6, 147}_0 ∨  p_882 ∨ break
c  in DIMACS:
-9566 -9567  9568  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 147}_2 ∧ -b^{6, 147}_1 ∧ -b^{6, 147}_0 ∧ true) 
c  in CNF:
c    -b^{6, 147}_2 ∨  b^{6, 147}_1 ∨  b^{6, 147}_0 ∨ false 
c  in DIMACS:
-9566  9567  9568  0

c  3 does not represent an automaton state.
c    -(-b^{6, 147}_2 ∧  b^{6, 147}_1 ∧  b^{6, 147}_0 ∧ true) 
c  in CNF:
c     b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ false 
c  in DIMACS:
 9566 -9567 -9568  0
c  -3 does not represent an automaton state.
c    -( b^{6, 147}_2 ∧  b^{6, 147}_1 ∧  b^{6, 147}_0 ∧ true) 
c  in CNF:
c    -b^{6, 147}_2 ∨ -b^{6, 147}_1 ∨ -b^{6, 147}_0 ∨ false 
c  in DIMACS:
-9566 -9567 -9568  0

c i = 148
c  -2+1 --> -1
c    ( b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧  p_888) -> ( b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0)
c  in CNF:
c    -b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨  b^{6, 149}_2
c    -b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_1
c    -b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨  b^{6, 149}_0
c  in DIMACS:
-9569 -9570  9571 -888  9572 0
-9569 -9570  9571 -888 -9573 0
-9569 -9570  9571 -888  9574 0

c  -1+1 --> 0
c    ( b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0 ∧  p_888) -> (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧ -b^{6, 149}_0)
c  in CNF:
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_2
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_1
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_0
c  in DIMACS:
-9569  9570 -9571 -888 -9572 0
-9569  9570 -9571 -888 -9573 0
-9569  9570 -9571 -888 -9574 0

c  0+1 --> 1
c    (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧  p_888) -> (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0)
c  in CNF:
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_2
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_1
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨  b^{6, 149}_0
c  in DIMACS:
 9569  9570  9571 -888 -9572 0
 9569  9570  9571 -888 -9573 0
 9569  9570  9571 -888  9574 0

c  1+1 --> 2
c    (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0 ∧  p_888) -> (-b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0)
c  in CNF:
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_2
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨  b^{6, 149}_1
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ -p_888 ∨ -b^{6, 149}_0
c  in DIMACS:
 9569  9570 -9571 -888 -9572 0
 9569  9570 -9571 -888  9573 0
 9569  9570 -9571 -888 -9574 0

c  2+1 --> break 
c    (-b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧  p_888) -> break
c  in CNF:
c     b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 9569 -9570  9571 -888 1162 0


c  2-1 --> 1
c    (-b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧ -p_888) -> (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0)
c  in CNF:
c     b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_2
c     b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_1
c     b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨  b^{6, 149}_0
c  in DIMACS:
 9569 -9570  9571  888 -9572 0
 9569 -9570  9571  888 -9573 0
 9569 -9570  9571  888  9574 0

c  1-1 --> 0
c    (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0 ∧ -p_888) -> (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧ -b^{6, 149}_0)
c  in CNF:
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_2
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_1
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_0
c  in DIMACS:
 9569  9570 -9571  888 -9572 0
 9569  9570 -9571  888 -9573 0
 9569  9570 -9571  888 -9574 0

c  0-1 --> -1
c    (-b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧ -p_888) -> ( b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0)
c  in CNF:
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨  b^{6, 149}_2
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_1
c     b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨  b^{6, 149}_0
c  in DIMACS:
 9569  9570  9571  888  9572 0
 9569  9570  9571  888 -9573 0
 9569  9570  9571  888  9574 0

c  -1-1 --> -2
c    ( b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧  b^{6, 148}_0 ∧ -p_888) -> ( b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0)
c  in CNF:
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨  b^{6, 149}_2
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨  b^{6, 149}_1
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨  p_888 ∨ -b^{6, 149}_0
c  in DIMACS:
-9569  9570 -9571  888  9572 0
-9569  9570 -9571  888  9573 0
-9569  9570 -9571  888 -9574 0

c  -2-1 --> break 
c    ( b^{6, 148}_2 ∧  b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨  b^{6, 148}_0 ∨  p_888 ∨ break
c  in DIMACS:
-9569 -9570  9571  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 148}_2 ∧ -b^{6, 148}_1 ∧ -b^{6, 148}_0 ∧ true) 
c  in CNF:
c    -b^{6, 148}_2 ∨  b^{6, 148}_1 ∨  b^{6, 148}_0 ∨ false 
c  in DIMACS:
-9569  9570  9571  0

c  3 does not represent an automaton state.
c    -(-b^{6, 148}_2 ∧  b^{6, 148}_1 ∧  b^{6, 148}_0 ∧ true) 
c  in CNF:
c     b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ false 
c  in DIMACS:
 9569 -9570 -9571  0
c  -3 does not represent an automaton state.
c    -( b^{6, 148}_2 ∧  b^{6, 148}_1 ∧  b^{6, 148}_0 ∧ true) 
c  in CNF:
c    -b^{6, 148}_2 ∨ -b^{6, 148}_1 ∨ -b^{6, 148}_0 ∨ false 
c  in DIMACS:
-9569 -9570 -9571  0

c i = 149
c  -2+1 --> -1
c    ( b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧  p_894) -> ( b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0)
c  in CNF:
c    -b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨  b^{6, 150}_2
c    -b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_1
c    -b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨  b^{6, 150}_0
c  in DIMACS:
-9572 -9573  9574 -894  9575 0
-9572 -9573  9574 -894 -9576 0
-9572 -9573  9574 -894  9577 0

c  -1+1 --> 0
c    ( b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0 ∧  p_894) -> (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧ -b^{6, 150}_0)
c  in CNF:
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_2
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_1
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_0
c  in DIMACS:
-9572  9573 -9574 -894 -9575 0
-9572  9573 -9574 -894 -9576 0
-9572  9573 -9574 -894 -9577 0

c  0+1 --> 1
c    (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧  p_894) -> (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0)
c  in CNF:
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_2
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_1
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨  b^{6, 150}_0
c  in DIMACS:
 9572  9573  9574 -894 -9575 0
 9572  9573  9574 -894 -9576 0
 9572  9573  9574 -894  9577 0

c  1+1 --> 2
c    (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0 ∧  p_894) -> (-b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0)
c  in CNF:
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_2
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨  b^{6, 150}_1
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ -p_894 ∨ -b^{6, 150}_0
c  in DIMACS:
 9572  9573 -9574 -894 -9575 0
 9572  9573 -9574 -894  9576 0
 9572  9573 -9574 -894 -9577 0

c  2+1 --> break 
c    (-b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧  p_894) -> break
c  in CNF:
c     b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 9572 -9573  9574 -894 1162 0


c  2-1 --> 1
c    (-b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧ -p_894) -> (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0)
c  in CNF:
c     b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_2
c     b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_1
c     b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨  b^{6, 150}_0
c  in DIMACS:
 9572 -9573  9574  894 -9575 0
 9572 -9573  9574  894 -9576 0
 9572 -9573  9574  894  9577 0

c  1-1 --> 0
c    (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0 ∧ -p_894) -> (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧ -b^{6, 150}_0)
c  in CNF:
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_2
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_1
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_0
c  in DIMACS:
 9572  9573 -9574  894 -9575 0
 9572  9573 -9574  894 -9576 0
 9572  9573 -9574  894 -9577 0

c  0-1 --> -1
c    (-b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧ -p_894) -> ( b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0)
c  in CNF:
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨  b^{6, 150}_2
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_1
c     b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨  b^{6, 150}_0
c  in DIMACS:
 9572  9573  9574  894  9575 0
 9572  9573  9574  894 -9576 0
 9572  9573  9574  894  9577 0

c  -1-1 --> -2
c    ( b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧  b^{6, 149}_0 ∧ -p_894) -> ( b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0)
c  in CNF:
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨  b^{6, 150}_2
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨  b^{6, 150}_1
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨  p_894 ∨ -b^{6, 150}_0
c  in DIMACS:
-9572  9573 -9574  894  9575 0
-9572  9573 -9574  894  9576 0
-9572  9573 -9574  894 -9577 0

c  -2-1 --> break 
c    ( b^{6, 149}_2 ∧  b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨  b^{6, 149}_0 ∨  p_894 ∨ break
c  in DIMACS:
-9572 -9573  9574  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 149}_2 ∧ -b^{6, 149}_1 ∧ -b^{6, 149}_0 ∧ true) 
c  in CNF:
c    -b^{6, 149}_2 ∨  b^{6, 149}_1 ∨  b^{6, 149}_0 ∨ false 
c  in DIMACS:
-9572  9573  9574  0

c  3 does not represent an automaton state.
c    -(-b^{6, 149}_2 ∧  b^{6, 149}_1 ∧  b^{6, 149}_0 ∧ true) 
c  in CNF:
c     b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ false 
c  in DIMACS:
 9572 -9573 -9574  0
c  -3 does not represent an automaton state.
c    -( b^{6, 149}_2 ∧  b^{6, 149}_1 ∧  b^{6, 149}_0 ∧ true) 
c  in CNF:
c    -b^{6, 149}_2 ∨ -b^{6, 149}_1 ∨ -b^{6, 149}_0 ∨ false 
c  in DIMACS:
-9572 -9573 -9574  0

c i = 150
c  -2+1 --> -1
c    ( b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧  p_900) -> ( b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0)
c  in CNF:
c    -b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨  b^{6, 151}_2
c    -b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_1
c    -b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨  b^{6, 151}_0
c  in DIMACS:
-9575 -9576  9577 -900  9578 0
-9575 -9576  9577 -900 -9579 0
-9575 -9576  9577 -900  9580 0

c  -1+1 --> 0
c    ( b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0 ∧  p_900) -> (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧ -b^{6, 151}_0)
c  in CNF:
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_2
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_1
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_0
c  in DIMACS:
-9575  9576 -9577 -900 -9578 0
-9575  9576 -9577 -900 -9579 0
-9575  9576 -9577 -900 -9580 0

c  0+1 --> 1
c    (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧  p_900) -> (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0)
c  in CNF:
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_2
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_1
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨  b^{6, 151}_0
c  in DIMACS:
 9575  9576  9577 -900 -9578 0
 9575  9576  9577 -900 -9579 0
 9575  9576  9577 -900  9580 0

c  1+1 --> 2
c    (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0 ∧  p_900) -> (-b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0)
c  in CNF:
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_2
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨  b^{6, 151}_1
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ -p_900 ∨ -b^{6, 151}_0
c  in DIMACS:
 9575  9576 -9577 -900 -9578 0
 9575  9576 -9577 -900  9579 0
 9575  9576 -9577 -900 -9580 0

c  2+1 --> break 
c    (-b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧  p_900) -> break
c  in CNF:
c     b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 9575 -9576  9577 -900 1162 0


c  2-1 --> 1
c    (-b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧ -p_900) -> (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0)
c  in CNF:
c     b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_2
c     b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_1
c     b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨  b^{6, 151}_0
c  in DIMACS:
 9575 -9576  9577  900 -9578 0
 9575 -9576  9577  900 -9579 0
 9575 -9576  9577  900  9580 0

c  1-1 --> 0
c    (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0 ∧ -p_900) -> (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧ -b^{6, 151}_0)
c  in CNF:
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_2
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_1
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_0
c  in DIMACS:
 9575  9576 -9577  900 -9578 0
 9575  9576 -9577  900 -9579 0
 9575  9576 -9577  900 -9580 0

c  0-1 --> -1
c    (-b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧ -p_900) -> ( b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0)
c  in CNF:
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨  b^{6, 151}_2
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_1
c     b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨  b^{6, 151}_0
c  in DIMACS:
 9575  9576  9577  900  9578 0
 9575  9576  9577  900 -9579 0
 9575  9576  9577  900  9580 0

c  -1-1 --> -2
c    ( b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧  b^{6, 150}_0 ∧ -p_900) -> ( b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0)
c  in CNF:
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨  b^{6, 151}_2
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨  b^{6, 151}_1
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨  p_900 ∨ -b^{6, 151}_0
c  in DIMACS:
-9575  9576 -9577  900  9578 0
-9575  9576 -9577  900  9579 0
-9575  9576 -9577  900 -9580 0

c  -2-1 --> break 
c    ( b^{6, 150}_2 ∧  b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨  b^{6, 150}_0 ∨  p_900 ∨ break
c  in DIMACS:
-9575 -9576  9577  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 150}_2 ∧ -b^{6, 150}_1 ∧ -b^{6, 150}_0 ∧ true) 
c  in CNF:
c    -b^{6, 150}_2 ∨  b^{6, 150}_1 ∨  b^{6, 150}_0 ∨ false 
c  in DIMACS:
-9575  9576  9577  0

c  3 does not represent an automaton state.
c    -(-b^{6, 150}_2 ∧  b^{6, 150}_1 ∧  b^{6, 150}_0 ∧ true) 
c  in CNF:
c     b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ false 
c  in DIMACS:
 9575 -9576 -9577  0
c  -3 does not represent an automaton state.
c    -( b^{6, 150}_2 ∧  b^{6, 150}_1 ∧  b^{6, 150}_0 ∧ true) 
c  in CNF:
c    -b^{6, 150}_2 ∨ -b^{6, 150}_1 ∨ -b^{6, 150}_0 ∨ false 
c  in DIMACS:
-9575 -9576 -9577  0

c i = 151
c  -2+1 --> -1
c    ( b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧  p_906) -> ( b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0)
c  in CNF:
c    -b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨  b^{6, 152}_2
c    -b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_1
c    -b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨  b^{6, 152}_0
c  in DIMACS:
-9578 -9579  9580 -906  9581 0
-9578 -9579  9580 -906 -9582 0
-9578 -9579  9580 -906  9583 0

c  -1+1 --> 0
c    ( b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0 ∧  p_906) -> (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧ -b^{6, 152}_0)
c  in CNF:
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_2
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_1
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_0
c  in DIMACS:
-9578  9579 -9580 -906 -9581 0
-9578  9579 -9580 -906 -9582 0
-9578  9579 -9580 -906 -9583 0

c  0+1 --> 1
c    (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧  p_906) -> (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0)
c  in CNF:
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_2
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_1
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨  b^{6, 152}_0
c  in DIMACS:
 9578  9579  9580 -906 -9581 0
 9578  9579  9580 -906 -9582 0
 9578  9579  9580 -906  9583 0

c  1+1 --> 2
c    (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0 ∧  p_906) -> (-b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0)
c  in CNF:
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_2
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨  b^{6, 152}_1
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ -p_906 ∨ -b^{6, 152}_0
c  in DIMACS:
 9578  9579 -9580 -906 -9581 0
 9578  9579 -9580 -906  9582 0
 9578  9579 -9580 -906 -9583 0

c  2+1 --> break 
c    (-b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧  p_906) -> break
c  in CNF:
c     b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 9578 -9579  9580 -906 1162 0


c  2-1 --> 1
c    (-b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧ -p_906) -> (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0)
c  in CNF:
c     b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_2
c     b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_1
c     b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨  b^{6, 152}_0
c  in DIMACS:
 9578 -9579  9580  906 -9581 0
 9578 -9579  9580  906 -9582 0
 9578 -9579  9580  906  9583 0

c  1-1 --> 0
c    (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0 ∧ -p_906) -> (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧ -b^{6, 152}_0)
c  in CNF:
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_2
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_1
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_0
c  in DIMACS:
 9578  9579 -9580  906 -9581 0
 9578  9579 -9580  906 -9582 0
 9578  9579 -9580  906 -9583 0

c  0-1 --> -1
c    (-b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧ -p_906) -> ( b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0)
c  in CNF:
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨  b^{6, 152}_2
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_1
c     b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨  b^{6, 152}_0
c  in DIMACS:
 9578  9579  9580  906  9581 0
 9578  9579  9580  906 -9582 0
 9578  9579  9580  906  9583 0

c  -1-1 --> -2
c    ( b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧  b^{6, 151}_0 ∧ -p_906) -> ( b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0)
c  in CNF:
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨  b^{6, 152}_2
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨  b^{6, 152}_1
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨  p_906 ∨ -b^{6, 152}_0
c  in DIMACS:
-9578  9579 -9580  906  9581 0
-9578  9579 -9580  906  9582 0
-9578  9579 -9580  906 -9583 0

c  -2-1 --> break 
c    ( b^{6, 151}_2 ∧  b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨  b^{6, 151}_0 ∨  p_906 ∨ break
c  in DIMACS:
-9578 -9579  9580  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 151}_2 ∧ -b^{6, 151}_1 ∧ -b^{6, 151}_0 ∧ true) 
c  in CNF:
c    -b^{6, 151}_2 ∨  b^{6, 151}_1 ∨  b^{6, 151}_0 ∨ false 
c  in DIMACS:
-9578  9579  9580  0

c  3 does not represent an automaton state.
c    -(-b^{6, 151}_2 ∧  b^{6, 151}_1 ∧  b^{6, 151}_0 ∧ true) 
c  in CNF:
c     b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ false 
c  in DIMACS:
 9578 -9579 -9580  0
c  -3 does not represent an automaton state.
c    -( b^{6, 151}_2 ∧  b^{6, 151}_1 ∧  b^{6, 151}_0 ∧ true) 
c  in CNF:
c    -b^{6, 151}_2 ∨ -b^{6, 151}_1 ∨ -b^{6, 151}_0 ∨ false 
c  in DIMACS:
-9578 -9579 -9580  0

c i = 152
c  -2+1 --> -1
c    ( b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧  p_912) -> ( b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0)
c  in CNF:
c    -b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨  b^{6, 153}_2
c    -b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_1
c    -b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨  b^{6, 153}_0
c  in DIMACS:
-9581 -9582  9583 -912  9584 0
-9581 -9582  9583 -912 -9585 0
-9581 -9582  9583 -912  9586 0

c  -1+1 --> 0
c    ( b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0 ∧  p_912) -> (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧ -b^{6, 153}_0)
c  in CNF:
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_2
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_1
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_0
c  in DIMACS:
-9581  9582 -9583 -912 -9584 0
-9581  9582 -9583 -912 -9585 0
-9581  9582 -9583 -912 -9586 0

c  0+1 --> 1
c    (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧  p_912) -> (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0)
c  in CNF:
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_2
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_1
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨  b^{6, 153}_0
c  in DIMACS:
 9581  9582  9583 -912 -9584 0
 9581  9582  9583 -912 -9585 0
 9581  9582  9583 -912  9586 0

c  1+1 --> 2
c    (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0 ∧  p_912) -> (-b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0)
c  in CNF:
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_2
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨  b^{6, 153}_1
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ -p_912 ∨ -b^{6, 153}_0
c  in DIMACS:
 9581  9582 -9583 -912 -9584 0
 9581  9582 -9583 -912  9585 0
 9581  9582 -9583 -912 -9586 0

c  2+1 --> break 
c    (-b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧  p_912) -> break
c  in CNF:
c     b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 9581 -9582  9583 -912 1162 0


c  2-1 --> 1
c    (-b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧ -p_912) -> (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0)
c  in CNF:
c     b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_2
c     b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_1
c     b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨  b^{6, 153}_0
c  in DIMACS:
 9581 -9582  9583  912 -9584 0
 9581 -9582  9583  912 -9585 0
 9581 -9582  9583  912  9586 0

c  1-1 --> 0
c    (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0 ∧ -p_912) -> (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧ -b^{6, 153}_0)
c  in CNF:
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_2
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_1
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_0
c  in DIMACS:
 9581  9582 -9583  912 -9584 0
 9581  9582 -9583  912 -9585 0
 9581  9582 -9583  912 -9586 0

c  0-1 --> -1
c    (-b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧ -p_912) -> ( b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0)
c  in CNF:
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨  b^{6, 153}_2
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_1
c     b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨  b^{6, 153}_0
c  in DIMACS:
 9581  9582  9583  912  9584 0
 9581  9582  9583  912 -9585 0
 9581  9582  9583  912  9586 0

c  -1-1 --> -2
c    ( b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧  b^{6, 152}_0 ∧ -p_912) -> ( b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0)
c  in CNF:
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨  b^{6, 153}_2
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨  b^{6, 153}_1
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨  p_912 ∨ -b^{6, 153}_0
c  in DIMACS:
-9581  9582 -9583  912  9584 0
-9581  9582 -9583  912  9585 0
-9581  9582 -9583  912 -9586 0

c  -2-1 --> break 
c    ( b^{6, 152}_2 ∧  b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨  b^{6, 152}_0 ∨  p_912 ∨ break
c  in DIMACS:
-9581 -9582  9583  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 152}_2 ∧ -b^{6, 152}_1 ∧ -b^{6, 152}_0 ∧ true) 
c  in CNF:
c    -b^{6, 152}_2 ∨  b^{6, 152}_1 ∨  b^{6, 152}_0 ∨ false 
c  in DIMACS:
-9581  9582  9583  0

c  3 does not represent an automaton state.
c    -(-b^{6, 152}_2 ∧  b^{6, 152}_1 ∧  b^{6, 152}_0 ∧ true) 
c  in CNF:
c     b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ false 
c  in DIMACS:
 9581 -9582 -9583  0
c  -3 does not represent an automaton state.
c    -( b^{6, 152}_2 ∧  b^{6, 152}_1 ∧  b^{6, 152}_0 ∧ true) 
c  in CNF:
c    -b^{6, 152}_2 ∨ -b^{6, 152}_1 ∨ -b^{6, 152}_0 ∨ false 
c  in DIMACS:
-9581 -9582 -9583  0

c i = 153
c  -2+1 --> -1
c    ( b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧  p_918) -> ( b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0)
c  in CNF:
c    -b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨  b^{6, 154}_2
c    -b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_1
c    -b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨  b^{6, 154}_0
c  in DIMACS:
-9584 -9585  9586 -918  9587 0
-9584 -9585  9586 -918 -9588 0
-9584 -9585  9586 -918  9589 0

c  -1+1 --> 0
c    ( b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0 ∧  p_918) -> (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧ -b^{6, 154}_0)
c  in CNF:
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_2
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_1
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_0
c  in DIMACS:
-9584  9585 -9586 -918 -9587 0
-9584  9585 -9586 -918 -9588 0
-9584  9585 -9586 -918 -9589 0

c  0+1 --> 1
c    (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧  p_918) -> (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0)
c  in CNF:
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_2
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_1
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨  b^{6, 154}_0
c  in DIMACS:
 9584  9585  9586 -918 -9587 0
 9584  9585  9586 -918 -9588 0
 9584  9585  9586 -918  9589 0

c  1+1 --> 2
c    (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0 ∧  p_918) -> (-b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0)
c  in CNF:
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_2
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨  b^{6, 154}_1
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ -p_918 ∨ -b^{6, 154}_0
c  in DIMACS:
 9584  9585 -9586 -918 -9587 0
 9584  9585 -9586 -918  9588 0
 9584  9585 -9586 -918 -9589 0

c  2+1 --> break 
c    (-b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧  p_918) -> break
c  in CNF:
c     b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 9584 -9585  9586 -918 1162 0


c  2-1 --> 1
c    (-b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧ -p_918) -> (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0)
c  in CNF:
c     b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_2
c     b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_1
c     b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨  b^{6, 154}_0
c  in DIMACS:
 9584 -9585  9586  918 -9587 0
 9584 -9585  9586  918 -9588 0
 9584 -9585  9586  918  9589 0

c  1-1 --> 0
c    (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0 ∧ -p_918) -> (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧ -b^{6, 154}_0)
c  in CNF:
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_2
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_1
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_0
c  in DIMACS:
 9584  9585 -9586  918 -9587 0
 9584  9585 -9586  918 -9588 0
 9584  9585 -9586  918 -9589 0

c  0-1 --> -1
c    (-b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧ -p_918) -> ( b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0)
c  in CNF:
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨  b^{6, 154}_2
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_1
c     b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨  b^{6, 154}_0
c  in DIMACS:
 9584  9585  9586  918  9587 0
 9584  9585  9586  918 -9588 0
 9584  9585  9586  918  9589 0

c  -1-1 --> -2
c    ( b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧  b^{6, 153}_0 ∧ -p_918) -> ( b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0)
c  in CNF:
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨  b^{6, 154}_2
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨  b^{6, 154}_1
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨  p_918 ∨ -b^{6, 154}_0
c  in DIMACS:
-9584  9585 -9586  918  9587 0
-9584  9585 -9586  918  9588 0
-9584  9585 -9586  918 -9589 0

c  -2-1 --> break 
c    ( b^{6, 153}_2 ∧  b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨  b^{6, 153}_0 ∨  p_918 ∨ break
c  in DIMACS:
-9584 -9585  9586  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 153}_2 ∧ -b^{6, 153}_1 ∧ -b^{6, 153}_0 ∧ true) 
c  in CNF:
c    -b^{6, 153}_2 ∨  b^{6, 153}_1 ∨  b^{6, 153}_0 ∨ false 
c  in DIMACS:
-9584  9585  9586  0

c  3 does not represent an automaton state.
c    -(-b^{6, 153}_2 ∧  b^{6, 153}_1 ∧  b^{6, 153}_0 ∧ true) 
c  in CNF:
c     b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ false 
c  in DIMACS:
 9584 -9585 -9586  0
c  -3 does not represent an automaton state.
c    -( b^{6, 153}_2 ∧  b^{6, 153}_1 ∧  b^{6, 153}_0 ∧ true) 
c  in CNF:
c    -b^{6, 153}_2 ∨ -b^{6, 153}_1 ∨ -b^{6, 153}_0 ∨ false 
c  in DIMACS:
-9584 -9585 -9586  0

c i = 154
c  -2+1 --> -1
c    ( b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧  p_924) -> ( b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0)
c  in CNF:
c    -b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨  b^{6, 155}_2
c    -b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_1
c    -b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨  b^{6, 155}_0
c  in DIMACS:
-9587 -9588  9589 -924  9590 0
-9587 -9588  9589 -924 -9591 0
-9587 -9588  9589 -924  9592 0

c  -1+1 --> 0
c    ( b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0 ∧  p_924) -> (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧ -b^{6, 155}_0)
c  in CNF:
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_2
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_1
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_0
c  in DIMACS:
-9587  9588 -9589 -924 -9590 0
-9587  9588 -9589 -924 -9591 0
-9587  9588 -9589 -924 -9592 0

c  0+1 --> 1
c    (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧  p_924) -> (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0)
c  in CNF:
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_2
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_1
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨  b^{6, 155}_0
c  in DIMACS:
 9587  9588  9589 -924 -9590 0
 9587  9588  9589 -924 -9591 0
 9587  9588  9589 -924  9592 0

c  1+1 --> 2
c    (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0 ∧  p_924) -> (-b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0)
c  in CNF:
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_2
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨  b^{6, 155}_1
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ -p_924 ∨ -b^{6, 155}_0
c  in DIMACS:
 9587  9588 -9589 -924 -9590 0
 9587  9588 -9589 -924  9591 0
 9587  9588 -9589 -924 -9592 0

c  2+1 --> break 
c    (-b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧  p_924) -> break
c  in CNF:
c     b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 9587 -9588  9589 -924 1162 0


c  2-1 --> 1
c    (-b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧ -p_924) -> (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0)
c  in CNF:
c     b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_2
c     b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_1
c     b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨  b^{6, 155}_0
c  in DIMACS:
 9587 -9588  9589  924 -9590 0
 9587 -9588  9589  924 -9591 0
 9587 -9588  9589  924  9592 0

c  1-1 --> 0
c    (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0 ∧ -p_924) -> (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧ -b^{6, 155}_0)
c  in CNF:
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_2
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_1
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_0
c  in DIMACS:
 9587  9588 -9589  924 -9590 0
 9587  9588 -9589  924 -9591 0
 9587  9588 -9589  924 -9592 0

c  0-1 --> -1
c    (-b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧ -p_924) -> ( b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0)
c  in CNF:
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨  b^{6, 155}_2
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_1
c     b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨  b^{6, 155}_0
c  in DIMACS:
 9587  9588  9589  924  9590 0
 9587  9588  9589  924 -9591 0
 9587  9588  9589  924  9592 0

c  -1-1 --> -2
c    ( b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧  b^{6, 154}_0 ∧ -p_924) -> ( b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0)
c  in CNF:
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨  b^{6, 155}_2
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨  b^{6, 155}_1
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨  p_924 ∨ -b^{6, 155}_0
c  in DIMACS:
-9587  9588 -9589  924  9590 0
-9587  9588 -9589  924  9591 0
-9587  9588 -9589  924 -9592 0

c  -2-1 --> break 
c    ( b^{6, 154}_2 ∧  b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨  b^{6, 154}_0 ∨  p_924 ∨ break
c  in DIMACS:
-9587 -9588  9589  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 154}_2 ∧ -b^{6, 154}_1 ∧ -b^{6, 154}_0 ∧ true) 
c  in CNF:
c    -b^{6, 154}_2 ∨  b^{6, 154}_1 ∨  b^{6, 154}_0 ∨ false 
c  in DIMACS:
-9587  9588  9589  0

c  3 does not represent an automaton state.
c    -(-b^{6, 154}_2 ∧  b^{6, 154}_1 ∧  b^{6, 154}_0 ∧ true) 
c  in CNF:
c     b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ false 
c  in DIMACS:
 9587 -9588 -9589  0
c  -3 does not represent an automaton state.
c    -( b^{6, 154}_2 ∧  b^{6, 154}_1 ∧  b^{6, 154}_0 ∧ true) 
c  in CNF:
c    -b^{6, 154}_2 ∨ -b^{6, 154}_1 ∨ -b^{6, 154}_0 ∨ false 
c  in DIMACS:
-9587 -9588 -9589  0

c i = 155
c  -2+1 --> -1
c    ( b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧  p_930) -> ( b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0)
c  in CNF:
c    -b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨  b^{6, 156}_2
c    -b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_1
c    -b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨  b^{6, 156}_0
c  in DIMACS:
-9590 -9591  9592 -930  9593 0
-9590 -9591  9592 -930 -9594 0
-9590 -9591  9592 -930  9595 0

c  -1+1 --> 0
c    ( b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0 ∧  p_930) -> (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧ -b^{6, 156}_0)
c  in CNF:
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_2
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_1
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_0
c  in DIMACS:
-9590  9591 -9592 -930 -9593 0
-9590  9591 -9592 -930 -9594 0
-9590  9591 -9592 -930 -9595 0

c  0+1 --> 1
c    (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧  p_930) -> (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0)
c  in CNF:
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_2
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_1
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨  b^{6, 156}_0
c  in DIMACS:
 9590  9591  9592 -930 -9593 0
 9590  9591  9592 -930 -9594 0
 9590  9591  9592 -930  9595 0

c  1+1 --> 2
c    (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0 ∧  p_930) -> (-b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0)
c  in CNF:
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_2
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨  b^{6, 156}_1
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ -p_930 ∨ -b^{6, 156}_0
c  in DIMACS:
 9590  9591 -9592 -930 -9593 0
 9590  9591 -9592 -930  9594 0
 9590  9591 -9592 -930 -9595 0

c  2+1 --> break 
c    (-b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧  p_930) -> break
c  in CNF:
c     b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 9590 -9591  9592 -930 1162 0


c  2-1 --> 1
c    (-b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧ -p_930) -> (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0)
c  in CNF:
c     b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_2
c     b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_1
c     b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨  b^{6, 156}_0
c  in DIMACS:
 9590 -9591  9592  930 -9593 0
 9590 -9591  9592  930 -9594 0
 9590 -9591  9592  930  9595 0

c  1-1 --> 0
c    (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0 ∧ -p_930) -> (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧ -b^{6, 156}_0)
c  in CNF:
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_2
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_1
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_0
c  in DIMACS:
 9590  9591 -9592  930 -9593 0
 9590  9591 -9592  930 -9594 0
 9590  9591 -9592  930 -9595 0

c  0-1 --> -1
c    (-b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧ -p_930) -> ( b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0)
c  in CNF:
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨  b^{6, 156}_2
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_1
c     b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨  b^{6, 156}_0
c  in DIMACS:
 9590  9591  9592  930  9593 0
 9590  9591  9592  930 -9594 0
 9590  9591  9592  930  9595 0

c  -1-1 --> -2
c    ( b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧  b^{6, 155}_0 ∧ -p_930) -> ( b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0)
c  in CNF:
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨  b^{6, 156}_2
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨  b^{6, 156}_1
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨  p_930 ∨ -b^{6, 156}_0
c  in DIMACS:
-9590  9591 -9592  930  9593 0
-9590  9591 -9592  930  9594 0
-9590  9591 -9592  930 -9595 0

c  -2-1 --> break 
c    ( b^{6, 155}_2 ∧  b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨  b^{6, 155}_0 ∨  p_930 ∨ break
c  in DIMACS:
-9590 -9591  9592  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 155}_2 ∧ -b^{6, 155}_1 ∧ -b^{6, 155}_0 ∧ true) 
c  in CNF:
c    -b^{6, 155}_2 ∨  b^{6, 155}_1 ∨  b^{6, 155}_0 ∨ false 
c  in DIMACS:
-9590  9591  9592  0

c  3 does not represent an automaton state.
c    -(-b^{6, 155}_2 ∧  b^{6, 155}_1 ∧  b^{6, 155}_0 ∧ true) 
c  in CNF:
c     b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ false 
c  in DIMACS:
 9590 -9591 -9592  0
c  -3 does not represent an automaton state.
c    -( b^{6, 155}_2 ∧  b^{6, 155}_1 ∧  b^{6, 155}_0 ∧ true) 
c  in CNF:
c    -b^{6, 155}_2 ∨ -b^{6, 155}_1 ∨ -b^{6, 155}_0 ∨ false 
c  in DIMACS:
-9590 -9591 -9592  0

c i = 156
c  -2+1 --> -1
c    ( b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧  p_936) -> ( b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0)
c  in CNF:
c    -b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨  b^{6, 157}_2
c    -b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_1
c    -b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨  b^{6, 157}_0
c  in DIMACS:
-9593 -9594  9595 -936  9596 0
-9593 -9594  9595 -936 -9597 0
-9593 -9594  9595 -936  9598 0

c  -1+1 --> 0
c    ( b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0 ∧  p_936) -> (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧ -b^{6, 157}_0)
c  in CNF:
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_2
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_1
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_0
c  in DIMACS:
-9593  9594 -9595 -936 -9596 0
-9593  9594 -9595 -936 -9597 0
-9593  9594 -9595 -936 -9598 0

c  0+1 --> 1
c    (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧  p_936) -> (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0)
c  in CNF:
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_2
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_1
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨  b^{6, 157}_0
c  in DIMACS:
 9593  9594  9595 -936 -9596 0
 9593  9594  9595 -936 -9597 0
 9593  9594  9595 -936  9598 0

c  1+1 --> 2
c    (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0 ∧  p_936) -> (-b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0)
c  in CNF:
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_2
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨  b^{6, 157}_1
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ -p_936 ∨ -b^{6, 157}_0
c  in DIMACS:
 9593  9594 -9595 -936 -9596 0
 9593  9594 -9595 -936  9597 0
 9593  9594 -9595 -936 -9598 0

c  2+1 --> break 
c    (-b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧  p_936) -> break
c  in CNF:
c     b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 9593 -9594  9595 -936 1162 0


c  2-1 --> 1
c    (-b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧ -p_936) -> (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0)
c  in CNF:
c     b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_2
c     b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_1
c     b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨  b^{6, 157}_0
c  in DIMACS:
 9593 -9594  9595  936 -9596 0
 9593 -9594  9595  936 -9597 0
 9593 -9594  9595  936  9598 0

c  1-1 --> 0
c    (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0 ∧ -p_936) -> (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧ -b^{6, 157}_0)
c  in CNF:
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_2
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_1
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_0
c  in DIMACS:
 9593  9594 -9595  936 -9596 0
 9593  9594 -9595  936 -9597 0
 9593  9594 -9595  936 -9598 0

c  0-1 --> -1
c    (-b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧ -p_936) -> ( b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0)
c  in CNF:
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨  b^{6, 157}_2
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_1
c     b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨  b^{6, 157}_0
c  in DIMACS:
 9593  9594  9595  936  9596 0
 9593  9594  9595  936 -9597 0
 9593  9594  9595  936  9598 0

c  -1-1 --> -2
c    ( b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧  b^{6, 156}_0 ∧ -p_936) -> ( b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0)
c  in CNF:
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨  b^{6, 157}_2
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨  b^{6, 157}_1
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨  p_936 ∨ -b^{6, 157}_0
c  in DIMACS:
-9593  9594 -9595  936  9596 0
-9593  9594 -9595  936  9597 0
-9593  9594 -9595  936 -9598 0

c  -2-1 --> break 
c    ( b^{6, 156}_2 ∧  b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨  b^{6, 156}_0 ∨  p_936 ∨ break
c  in DIMACS:
-9593 -9594  9595  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 156}_2 ∧ -b^{6, 156}_1 ∧ -b^{6, 156}_0 ∧ true) 
c  in CNF:
c    -b^{6, 156}_2 ∨  b^{6, 156}_1 ∨  b^{6, 156}_0 ∨ false 
c  in DIMACS:
-9593  9594  9595  0

c  3 does not represent an automaton state.
c    -(-b^{6, 156}_2 ∧  b^{6, 156}_1 ∧  b^{6, 156}_0 ∧ true) 
c  in CNF:
c     b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ false 
c  in DIMACS:
 9593 -9594 -9595  0
c  -3 does not represent an automaton state.
c    -( b^{6, 156}_2 ∧  b^{6, 156}_1 ∧  b^{6, 156}_0 ∧ true) 
c  in CNF:
c    -b^{6, 156}_2 ∨ -b^{6, 156}_1 ∨ -b^{6, 156}_0 ∨ false 
c  in DIMACS:
-9593 -9594 -9595  0

c i = 157
c  -2+1 --> -1
c    ( b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧  p_942) -> ( b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0)
c  in CNF:
c    -b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨  b^{6, 158}_2
c    -b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_1
c    -b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨  b^{6, 158}_0
c  in DIMACS:
-9596 -9597  9598 -942  9599 0
-9596 -9597  9598 -942 -9600 0
-9596 -9597  9598 -942  9601 0

c  -1+1 --> 0
c    ( b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0 ∧  p_942) -> (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧ -b^{6, 158}_0)
c  in CNF:
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_2
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_1
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_0
c  in DIMACS:
-9596  9597 -9598 -942 -9599 0
-9596  9597 -9598 -942 -9600 0
-9596  9597 -9598 -942 -9601 0

c  0+1 --> 1
c    (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧  p_942) -> (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0)
c  in CNF:
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_2
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_1
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨  b^{6, 158}_0
c  in DIMACS:
 9596  9597  9598 -942 -9599 0
 9596  9597  9598 -942 -9600 0
 9596  9597  9598 -942  9601 0

c  1+1 --> 2
c    (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0 ∧  p_942) -> (-b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0)
c  in CNF:
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_2
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨  b^{6, 158}_1
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ -p_942 ∨ -b^{6, 158}_0
c  in DIMACS:
 9596  9597 -9598 -942 -9599 0
 9596  9597 -9598 -942  9600 0
 9596  9597 -9598 -942 -9601 0

c  2+1 --> break 
c    (-b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧  p_942) -> break
c  in CNF:
c     b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 9596 -9597  9598 -942 1162 0


c  2-1 --> 1
c    (-b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧ -p_942) -> (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0)
c  in CNF:
c     b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_2
c     b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_1
c     b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨  b^{6, 158}_0
c  in DIMACS:
 9596 -9597  9598  942 -9599 0
 9596 -9597  9598  942 -9600 0
 9596 -9597  9598  942  9601 0

c  1-1 --> 0
c    (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0 ∧ -p_942) -> (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧ -b^{6, 158}_0)
c  in CNF:
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_2
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_1
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_0
c  in DIMACS:
 9596  9597 -9598  942 -9599 0
 9596  9597 -9598  942 -9600 0
 9596  9597 -9598  942 -9601 0

c  0-1 --> -1
c    (-b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧ -p_942) -> ( b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0)
c  in CNF:
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨  b^{6, 158}_2
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_1
c     b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨  b^{6, 158}_0
c  in DIMACS:
 9596  9597  9598  942  9599 0
 9596  9597  9598  942 -9600 0
 9596  9597  9598  942  9601 0

c  -1-1 --> -2
c    ( b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧  b^{6, 157}_0 ∧ -p_942) -> ( b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0)
c  in CNF:
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨  b^{6, 158}_2
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨  b^{6, 158}_1
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨  p_942 ∨ -b^{6, 158}_0
c  in DIMACS:
-9596  9597 -9598  942  9599 0
-9596  9597 -9598  942  9600 0
-9596  9597 -9598  942 -9601 0

c  -2-1 --> break 
c    ( b^{6, 157}_2 ∧  b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨  b^{6, 157}_0 ∨  p_942 ∨ break
c  in DIMACS:
-9596 -9597  9598  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 157}_2 ∧ -b^{6, 157}_1 ∧ -b^{6, 157}_0 ∧ true) 
c  in CNF:
c    -b^{6, 157}_2 ∨  b^{6, 157}_1 ∨  b^{6, 157}_0 ∨ false 
c  in DIMACS:
-9596  9597  9598  0

c  3 does not represent an automaton state.
c    -(-b^{6, 157}_2 ∧  b^{6, 157}_1 ∧  b^{6, 157}_0 ∧ true) 
c  in CNF:
c     b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ false 
c  in DIMACS:
 9596 -9597 -9598  0
c  -3 does not represent an automaton state.
c    -( b^{6, 157}_2 ∧  b^{6, 157}_1 ∧  b^{6, 157}_0 ∧ true) 
c  in CNF:
c    -b^{6, 157}_2 ∨ -b^{6, 157}_1 ∨ -b^{6, 157}_0 ∨ false 
c  in DIMACS:
-9596 -9597 -9598  0

c i = 158
c  -2+1 --> -1
c    ( b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧  p_948) -> ( b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0)
c  in CNF:
c    -b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨  b^{6, 159}_2
c    -b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_1
c    -b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨  b^{6, 159}_0
c  in DIMACS:
-9599 -9600  9601 -948  9602 0
-9599 -9600  9601 -948 -9603 0
-9599 -9600  9601 -948  9604 0

c  -1+1 --> 0
c    ( b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0 ∧  p_948) -> (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧ -b^{6, 159}_0)
c  in CNF:
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_2
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_1
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_0
c  in DIMACS:
-9599  9600 -9601 -948 -9602 0
-9599  9600 -9601 -948 -9603 0
-9599  9600 -9601 -948 -9604 0

c  0+1 --> 1
c    (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧  p_948) -> (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0)
c  in CNF:
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_2
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_1
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨  b^{6, 159}_0
c  in DIMACS:
 9599  9600  9601 -948 -9602 0
 9599  9600  9601 -948 -9603 0
 9599  9600  9601 -948  9604 0

c  1+1 --> 2
c    (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0 ∧  p_948) -> (-b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0)
c  in CNF:
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_2
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨  b^{6, 159}_1
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ -p_948 ∨ -b^{6, 159}_0
c  in DIMACS:
 9599  9600 -9601 -948 -9602 0
 9599  9600 -9601 -948  9603 0
 9599  9600 -9601 -948 -9604 0

c  2+1 --> break 
c    (-b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧  p_948) -> break
c  in CNF:
c     b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 9599 -9600  9601 -948 1162 0


c  2-1 --> 1
c    (-b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧ -p_948) -> (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0)
c  in CNF:
c     b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_2
c     b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_1
c     b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨  b^{6, 159}_0
c  in DIMACS:
 9599 -9600  9601  948 -9602 0
 9599 -9600  9601  948 -9603 0
 9599 -9600  9601  948  9604 0

c  1-1 --> 0
c    (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0 ∧ -p_948) -> (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧ -b^{6, 159}_0)
c  in CNF:
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_2
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_1
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_0
c  in DIMACS:
 9599  9600 -9601  948 -9602 0
 9599  9600 -9601  948 -9603 0
 9599  9600 -9601  948 -9604 0

c  0-1 --> -1
c    (-b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧ -p_948) -> ( b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0)
c  in CNF:
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨  b^{6, 159}_2
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_1
c     b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨  b^{6, 159}_0
c  in DIMACS:
 9599  9600  9601  948  9602 0
 9599  9600  9601  948 -9603 0
 9599  9600  9601  948  9604 0

c  -1-1 --> -2
c    ( b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧  b^{6, 158}_0 ∧ -p_948) -> ( b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0)
c  in CNF:
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨  b^{6, 159}_2
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨  b^{6, 159}_1
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨  p_948 ∨ -b^{6, 159}_0
c  in DIMACS:
-9599  9600 -9601  948  9602 0
-9599  9600 -9601  948  9603 0
-9599  9600 -9601  948 -9604 0

c  -2-1 --> break 
c    ( b^{6, 158}_2 ∧  b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨  b^{6, 158}_0 ∨  p_948 ∨ break
c  in DIMACS:
-9599 -9600  9601  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 158}_2 ∧ -b^{6, 158}_1 ∧ -b^{6, 158}_0 ∧ true) 
c  in CNF:
c    -b^{6, 158}_2 ∨  b^{6, 158}_1 ∨  b^{6, 158}_0 ∨ false 
c  in DIMACS:
-9599  9600  9601  0

c  3 does not represent an automaton state.
c    -(-b^{6, 158}_2 ∧  b^{6, 158}_1 ∧  b^{6, 158}_0 ∧ true) 
c  in CNF:
c     b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ false 
c  in DIMACS:
 9599 -9600 -9601  0
c  -3 does not represent an automaton state.
c    -( b^{6, 158}_2 ∧  b^{6, 158}_1 ∧  b^{6, 158}_0 ∧ true) 
c  in CNF:
c    -b^{6, 158}_2 ∨ -b^{6, 158}_1 ∨ -b^{6, 158}_0 ∨ false 
c  in DIMACS:
-9599 -9600 -9601  0

c i = 159
c  -2+1 --> -1
c    ( b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧  p_954) -> ( b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0)
c  in CNF:
c    -b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨  b^{6, 160}_2
c    -b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_1
c    -b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨  b^{6, 160}_0
c  in DIMACS:
-9602 -9603  9604 -954  9605 0
-9602 -9603  9604 -954 -9606 0
-9602 -9603  9604 -954  9607 0

c  -1+1 --> 0
c    ( b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0 ∧  p_954) -> (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧ -b^{6, 160}_0)
c  in CNF:
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_2
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_1
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_0
c  in DIMACS:
-9602  9603 -9604 -954 -9605 0
-9602  9603 -9604 -954 -9606 0
-9602  9603 -9604 -954 -9607 0

c  0+1 --> 1
c    (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧  p_954) -> (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0)
c  in CNF:
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_2
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_1
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨  b^{6, 160}_0
c  in DIMACS:
 9602  9603  9604 -954 -9605 0
 9602  9603  9604 -954 -9606 0
 9602  9603  9604 -954  9607 0

c  1+1 --> 2
c    (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0 ∧  p_954) -> (-b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0)
c  in CNF:
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_2
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨  b^{6, 160}_1
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ -p_954 ∨ -b^{6, 160}_0
c  in DIMACS:
 9602  9603 -9604 -954 -9605 0
 9602  9603 -9604 -954  9606 0
 9602  9603 -9604 -954 -9607 0

c  2+1 --> break 
c    (-b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧  p_954) -> break
c  in CNF:
c     b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 9602 -9603  9604 -954 1162 0


c  2-1 --> 1
c    (-b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧ -p_954) -> (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0)
c  in CNF:
c     b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_2
c     b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_1
c     b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨  b^{6, 160}_0
c  in DIMACS:
 9602 -9603  9604  954 -9605 0
 9602 -9603  9604  954 -9606 0
 9602 -9603  9604  954  9607 0

c  1-1 --> 0
c    (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0 ∧ -p_954) -> (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧ -b^{6, 160}_0)
c  in CNF:
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_2
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_1
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_0
c  in DIMACS:
 9602  9603 -9604  954 -9605 0
 9602  9603 -9604  954 -9606 0
 9602  9603 -9604  954 -9607 0

c  0-1 --> -1
c    (-b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧ -p_954) -> ( b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0)
c  in CNF:
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨  b^{6, 160}_2
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_1
c     b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨  b^{6, 160}_0
c  in DIMACS:
 9602  9603  9604  954  9605 0
 9602  9603  9604  954 -9606 0
 9602  9603  9604  954  9607 0

c  -1-1 --> -2
c    ( b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧  b^{6, 159}_0 ∧ -p_954) -> ( b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0)
c  in CNF:
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨  b^{6, 160}_2
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨  b^{6, 160}_1
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨  p_954 ∨ -b^{6, 160}_0
c  in DIMACS:
-9602  9603 -9604  954  9605 0
-9602  9603 -9604  954  9606 0
-9602  9603 -9604  954 -9607 0

c  -2-1 --> break 
c    ( b^{6, 159}_2 ∧  b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨  b^{6, 159}_0 ∨  p_954 ∨ break
c  in DIMACS:
-9602 -9603  9604  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 159}_2 ∧ -b^{6, 159}_1 ∧ -b^{6, 159}_0 ∧ true) 
c  in CNF:
c    -b^{6, 159}_2 ∨  b^{6, 159}_1 ∨  b^{6, 159}_0 ∨ false 
c  in DIMACS:
-9602  9603  9604  0

c  3 does not represent an automaton state.
c    -(-b^{6, 159}_2 ∧  b^{6, 159}_1 ∧  b^{6, 159}_0 ∧ true) 
c  in CNF:
c     b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ false 
c  in DIMACS:
 9602 -9603 -9604  0
c  -3 does not represent an automaton state.
c    -( b^{6, 159}_2 ∧  b^{6, 159}_1 ∧  b^{6, 159}_0 ∧ true) 
c  in CNF:
c    -b^{6, 159}_2 ∨ -b^{6, 159}_1 ∨ -b^{6, 159}_0 ∨ false 
c  in DIMACS:
-9602 -9603 -9604  0

c i = 160
c  -2+1 --> -1
c    ( b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧  p_960) -> ( b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0)
c  in CNF:
c    -b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨  b^{6, 161}_2
c    -b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_1
c    -b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨  b^{6, 161}_0
c  in DIMACS:
-9605 -9606  9607 -960  9608 0
-9605 -9606  9607 -960 -9609 0
-9605 -9606  9607 -960  9610 0

c  -1+1 --> 0
c    ( b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0 ∧  p_960) -> (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧ -b^{6, 161}_0)
c  in CNF:
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_2
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_1
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_0
c  in DIMACS:
-9605  9606 -9607 -960 -9608 0
-9605  9606 -9607 -960 -9609 0
-9605  9606 -9607 -960 -9610 0

c  0+1 --> 1
c    (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧  p_960) -> (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0)
c  in CNF:
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_2
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_1
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨  b^{6, 161}_0
c  in DIMACS:
 9605  9606  9607 -960 -9608 0
 9605  9606  9607 -960 -9609 0
 9605  9606  9607 -960  9610 0

c  1+1 --> 2
c    (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0 ∧  p_960) -> (-b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0)
c  in CNF:
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_2
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨  b^{6, 161}_1
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ -p_960 ∨ -b^{6, 161}_0
c  in DIMACS:
 9605  9606 -9607 -960 -9608 0
 9605  9606 -9607 -960  9609 0
 9605  9606 -9607 -960 -9610 0

c  2+1 --> break 
c    (-b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧  p_960) -> break
c  in CNF:
c     b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 9605 -9606  9607 -960 1162 0


c  2-1 --> 1
c    (-b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧ -p_960) -> (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0)
c  in CNF:
c     b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_2
c     b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_1
c     b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨  b^{6, 161}_0
c  in DIMACS:
 9605 -9606  9607  960 -9608 0
 9605 -9606  9607  960 -9609 0
 9605 -9606  9607  960  9610 0

c  1-1 --> 0
c    (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0 ∧ -p_960) -> (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧ -b^{6, 161}_0)
c  in CNF:
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_2
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_1
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_0
c  in DIMACS:
 9605  9606 -9607  960 -9608 0
 9605  9606 -9607  960 -9609 0
 9605  9606 -9607  960 -9610 0

c  0-1 --> -1
c    (-b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧ -p_960) -> ( b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0)
c  in CNF:
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨  b^{6, 161}_2
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_1
c     b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨  b^{6, 161}_0
c  in DIMACS:
 9605  9606  9607  960  9608 0
 9605  9606  9607  960 -9609 0
 9605  9606  9607  960  9610 0

c  -1-1 --> -2
c    ( b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧  b^{6, 160}_0 ∧ -p_960) -> ( b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0)
c  in CNF:
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨  b^{6, 161}_2
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨  b^{6, 161}_1
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨  p_960 ∨ -b^{6, 161}_0
c  in DIMACS:
-9605  9606 -9607  960  9608 0
-9605  9606 -9607  960  9609 0
-9605  9606 -9607  960 -9610 0

c  -2-1 --> break 
c    ( b^{6, 160}_2 ∧  b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨  b^{6, 160}_0 ∨  p_960 ∨ break
c  in DIMACS:
-9605 -9606  9607  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 160}_2 ∧ -b^{6, 160}_1 ∧ -b^{6, 160}_0 ∧ true) 
c  in CNF:
c    -b^{6, 160}_2 ∨  b^{6, 160}_1 ∨  b^{6, 160}_0 ∨ false 
c  in DIMACS:
-9605  9606  9607  0

c  3 does not represent an automaton state.
c    -(-b^{6, 160}_2 ∧  b^{6, 160}_1 ∧  b^{6, 160}_0 ∧ true) 
c  in CNF:
c     b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ false 
c  in DIMACS:
 9605 -9606 -9607  0
c  -3 does not represent an automaton state.
c    -( b^{6, 160}_2 ∧  b^{6, 160}_1 ∧  b^{6, 160}_0 ∧ true) 
c  in CNF:
c    -b^{6, 160}_2 ∨ -b^{6, 160}_1 ∨ -b^{6, 160}_0 ∨ false 
c  in DIMACS:
-9605 -9606 -9607  0

c i = 161
c  -2+1 --> -1
c    ( b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧  p_966) -> ( b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0)
c  in CNF:
c    -b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨  b^{6, 162}_2
c    -b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_1
c    -b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨  b^{6, 162}_0
c  in DIMACS:
-9608 -9609  9610 -966  9611 0
-9608 -9609  9610 -966 -9612 0
-9608 -9609  9610 -966  9613 0

c  -1+1 --> 0
c    ( b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0 ∧  p_966) -> (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧ -b^{6, 162}_0)
c  in CNF:
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_2
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_1
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_0
c  in DIMACS:
-9608  9609 -9610 -966 -9611 0
-9608  9609 -9610 -966 -9612 0
-9608  9609 -9610 -966 -9613 0

c  0+1 --> 1
c    (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧  p_966) -> (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0)
c  in CNF:
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_2
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_1
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨  b^{6, 162}_0
c  in DIMACS:
 9608  9609  9610 -966 -9611 0
 9608  9609  9610 -966 -9612 0
 9608  9609  9610 -966  9613 0

c  1+1 --> 2
c    (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0 ∧  p_966) -> (-b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0)
c  in CNF:
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_2
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨  b^{6, 162}_1
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ -p_966 ∨ -b^{6, 162}_0
c  in DIMACS:
 9608  9609 -9610 -966 -9611 0
 9608  9609 -9610 -966  9612 0
 9608  9609 -9610 -966 -9613 0

c  2+1 --> break 
c    (-b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧  p_966) -> break
c  in CNF:
c     b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 9608 -9609  9610 -966 1162 0


c  2-1 --> 1
c    (-b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧ -p_966) -> (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0)
c  in CNF:
c     b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_2
c     b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_1
c     b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨  b^{6, 162}_0
c  in DIMACS:
 9608 -9609  9610  966 -9611 0
 9608 -9609  9610  966 -9612 0
 9608 -9609  9610  966  9613 0

c  1-1 --> 0
c    (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0 ∧ -p_966) -> (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧ -b^{6, 162}_0)
c  in CNF:
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_2
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_1
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_0
c  in DIMACS:
 9608  9609 -9610  966 -9611 0
 9608  9609 -9610  966 -9612 0
 9608  9609 -9610  966 -9613 0

c  0-1 --> -1
c    (-b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧ -p_966) -> ( b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0)
c  in CNF:
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨  b^{6, 162}_2
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_1
c     b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨  b^{6, 162}_0
c  in DIMACS:
 9608  9609  9610  966  9611 0
 9608  9609  9610  966 -9612 0
 9608  9609  9610  966  9613 0

c  -1-1 --> -2
c    ( b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧  b^{6, 161}_0 ∧ -p_966) -> ( b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0)
c  in CNF:
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨  b^{6, 162}_2
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨  b^{6, 162}_1
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨  p_966 ∨ -b^{6, 162}_0
c  in DIMACS:
-9608  9609 -9610  966  9611 0
-9608  9609 -9610  966  9612 0
-9608  9609 -9610  966 -9613 0

c  -2-1 --> break 
c    ( b^{6, 161}_2 ∧  b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨  b^{6, 161}_0 ∨  p_966 ∨ break
c  in DIMACS:
-9608 -9609  9610  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 161}_2 ∧ -b^{6, 161}_1 ∧ -b^{6, 161}_0 ∧ true) 
c  in CNF:
c    -b^{6, 161}_2 ∨  b^{6, 161}_1 ∨  b^{6, 161}_0 ∨ false 
c  in DIMACS:
-9608  9609  9610  0

c  3 does not represent an automaton state.
c    -(-b^{6, 161}_2 ∧  b^{6, 161}_1 ∧  b^{6, 161}_0 ∧ true) 
c  in CNF:
c     b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ false 
c  in DIMACS:
 9608 -9609 -9610  0
c  -3 does not represent an automaton state.
c    -( b^{6, 161}_2 ∧  b^{6, 161}_1 ∧  b^{6, 161}_0 ∧ true) 
c  in CNF:
c    -b^{6, 161}_2 ∨ -b^{6, 161}_1 ∨ -b^{6, 161}_0 ∨ false 
c  in DIMACS:
-9608 -9609 -9610  0

c i = 162
c  -2+1 --> -1
c    ( b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧  p_972) -> ( b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0)
c  in CNF:
c    -b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨  b^{6, 163}_2
c    -b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_1
c    -b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨  b^{6, 163}_0
c  in DIMACS:
-9611 -9612  9613 -972  9614 0
-9611 -9612  9613 -972 -9615 0
-9611 -9612  9613 -972  9616 0

c  -1+1 --> 0
c    ( b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0 ∧  p_972) -> (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧ -b^{6, 163}_0)
c  in CNF:
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_2
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_1
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_0
c  in DIMACS:
-9611  9612 -9613 -972 -9614 0
-9611  9612 -9613 -972 -9615 0
-9611  9612 -9613 -972 -9616 0

c  0+1 --> 1
c    (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧  p_972) -> (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0)
c  in CNF:
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_2
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_1
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨  b^{6, 163}_0
c  in DIMACS:
 9611  9612  9613 -972 -9614 0
 9611  9612  9613 -972 -9615 0
 9611  9612  9613 -972  9616 0

c  1+1 --> 2
c    (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0 ∧  p_972) -> (-b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0)
c  in CNF:
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_2
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨  b^{6, 163}_1
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ -p_972 ∨ -b^{6, 163}_0
c  in DIMACS:
 9611  9612 -9613 -972 -9614 0
 9611  9612 -9613 -972  9615 0
 9611  9612 -9613 -972 -9616 0

c  2+1 --> break 
c    (-b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧  p_972) -> break
c  in CNF:
c     b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 9611 -9612  9613 -972 1162 0


c  2-1 --> 1
c    (-b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧ -p_972) -> (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0)
c  in CNF:
c     b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_2
c     b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_1
c     b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨  b^{6, 163}_0
c  in DIMACS:
 9611 -9612  9613  972 -9614 0
 9611 -9612  9613  972 -9615 0
 9611 -9612  9613  972  9616 0

c  1-1 --> 0
c    (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0 ∧ -p_972) -> (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧ -b^{6, 163}_0)
c  in CNF:
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_2
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_1
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_0
c  in DIMACS:
 9611  9612 -9613  972 -9614 0
 9611  9612 -9613  972 -9615 0
 9611  9612 -9613  972 -9616 0

c  0-1 --> -1
c    (-b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧ -p_972) -> ( b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0)
c  in CNF:
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨  b^{6, 163}_2
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_1
c     b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨  b^{6, 163}_0
c  in DIMACS:
 9611  9612  9613  972  9614 0
 9611  9612  9613  972 -9615 0
 9611  9612  9613  972  9616 0

c  -1-1 --> -2
c    ( b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧  b^{6, 162}_0 ∧ -p_972) -> ( b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0)
c  in CNF:
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨  b^{6, 163}_2
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨  b^{6, 163}_1
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨  p_972 ∨ -b^{6, 163}_0
c  in DIMACS:
-9611  9612 -9613  972  9614 0
-9611  9612 -9613  972  9615 0
-9611  9612 -9613  972 -9616 0

c  -2-1 --> break 
c    ( b^{6, 162}_2 ∧  b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨  b^{6, 162}_0 ∨  p_972 ∨ break
c  in DIMACS:
-9611 -9612  9613  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 162}_2 ∧ -b^{6, 162}_1 ∧ -b^{6, 162}_0 ∧ true) 
c  in CNF:
c    -b^{6, 162}_2 ∨  b^{6, 162}_1 ∨  b^{6, 162}_0 ∨ false 
c  in DIMACS:
-9611  9612  9613  0

c  3 does not represent an automaton state.
c    -(-b^{6, 162}_2 ∧  b^{6, 162}_1 ∧  b^{6, 162}_0 ∧ true) 
c  in CNF:
c     b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ false 
c  in DIMACS:
 9611 -9612 -9613  0
c  -3 does not represent an automaton state.
c    -( b^{6, 162}_2 ∧  b^{6, 162}_1 ∧  b^{6, 162}_0 ∧ true) 
c  in CNF:
c    -b^{6, 162}_2 ∨ -b^{6, 162}_1 ∨ -b^{6, 162}_0 ∨ false 
c  in DIMACS:
-9611 -9612 -9613  0

c i = 163
c  -2+1 --> -1
c    ( b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧  p_978) -> ( b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0)
c  in CNF:
c    -b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨  b^{6, 164}_2
c    -b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_1
c    -b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨  b^{6, 164}_0
c  in DIMACS:
-9614 -9615  9616 -978  9617 0
-9614 -9615  9616 -978 -9618 0
-9614 -9615  9616 -978  9619 0

c  -1+1 --> 0
c    ( b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0 ∧  p_978) -> (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧ -b^{6, 164}_0)
c  in CNF:
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_2
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_1
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_0
c  in DIMACS:
-9614  9615 -9616 -978 -9617 0
-9614  9615 -9616 -978 -9618 0
-9614  9615 -9616 -978 -9619 0

c  0+1 --> 1
c    (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧  p_978) -> (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0)
c  in CNF:
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_2
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_1
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨  b^{6, 164}_0
c  in DIMACS:
 9614  9615  9616 -978 -9617 0
 9614  9615  9616 -978 -9618 0
 9614  9615  9616 -978  9619 0

c  1+1 --> 2
c    (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0 ∧  p_978) -> (-b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0)
c  in CNF:
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_2
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨  b^{6, 164}_1
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ -p_978 ∨ -b^{6, 164}_0
c  in DIMACS:
 9614  9615 -9616 -978 -9617 0
 9614  9615 -9616 -978  9618 0
 9614  9615 -9616 -978 -9619 0

c  2+1 --> break 
c    (-b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧  p_978) -> break
c  in CNF:
c     b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 9614 -9615  9616 -978 1162 0


c  2-1 --> 1
c    (-b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧ -p_978) -> (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0)
c  in CNF:
c     b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_2
c     b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_1
c     b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨  b^{6, 164}_0
c  in DIMACS:
 9614 -9615  9616  978 -9617 0
 9614 -9615  9616  978 -9618 0
 9614 -9615  9616  978  9619 0

c  1-1 --> 0
c    (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0 ∧ -p_978) -> (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧ -b^{6, 164}_0)
c  in CNF:
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_2
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_1
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_0
c  in DIMACS:
 9614  9615 -9616  978 -9617 0
 9614  9615 -9616  978 -9618 0
 9614  9615 -9616  978 -9619 0

c  0-1 --> -1
c    (-b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧ -p_978) -> ( b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0)
c  in CNF:
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨  b^{6, 164}_2
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_1
c     b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨  b^{6, 164}_0
c  in DIMACS:
 9614  9615  9616  978  9617 0
 9614  9615  9616  978 -9618 0
 9614  9615  9616  978  9619 0

c  -1-1 --> -2
c    ( b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧  b^{6, 163}_0 ∧ -p_978) -> ( b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0)
c  in CNF:
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨  b^{6, 164}_2
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨  b^{6, 164}_1
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨  p_978 ∨ -b^{6, 164}_0
c  in DIMACS:
-9614  9615 -9616  978  9617 0
-9614  9615 -9616  978  9618 0
-9614  9615 -9616  978 -9619 0

c  -2-1 --> break 
c    ( b^{6, 163}_2 ∧  b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨  b^{6, 163}_0 ∨  p_978 ∨ break
c  in DIMACS:
-9614 -9615  9616  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 163}_2 ∧ -b^{6, 163}_1 ∧ -b^{6, 163}_0 ∧ true) 
c  in CNF:
c    -b^{6, 163}_2 ∨  b^{6, 163}_1 ∨  b^{6, 163}_0 ∨ false 
c  in DIMACS:
-9614  9615  9616  0

c  3 does not represent an automaton state.
c    -(-b^{6, 163}_2 ∧  b^{6, 163}_1 ∧  b^{6, 163}_0 ∧ true) 
c  in CNF:
c     b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ false 
c  in DIMACS:
 9614 -9615 -9616  0
c  -3 does not represent an automaton state.
c    -( b^{6, 163}_2 ∧  b^{6, 163}_1 ∧  b^{6, 163}_0 ∧ true) 
c  in CNF:
c    -b^{6, 163}_2 ∨ -b^{6, 163}_1 ∨ -b^{6, 163}_0 ∨ false 
c  in DIMACS:
-9614 -9615 -9616  0

c i = 164
c  -2+1 --> -1
c    ( b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧  p_984) -> ( b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0)
c  in CNF:
c    -b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨  b^{6, 165}_2
c    -b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_1
c    -b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨  b^{6, 165}_0
c  in DIMACS:
-9617 -9618  9619 -984  9620 0
-9617 -9618  9619 -984 -9621 0
-9617 -9618  9619 -984  9622 0

c  -1+1 --> 0
c    ( b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0 ∧  p_984) -> (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧ -b^{6, 165}_0)
c  in CNF:
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_2
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_1
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_0
c  in DIMACS:
-9617  9618 -9619 -984 -9620 0
-9617  9618 -9619 -984 -9621 0
-9617  9618 -9619 -984 -9622 0

c  0+1 --> 1
c    (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧  p_984) -> (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0)
c  in CNF:
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_2
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_1
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨  b^{6, 165}_0
c  in DIMACS:
 9617  9618  9619 -984 -9620 0
 9617  9618  9619 -984 -9621 0
 9617  9618  9619 -984  9622 0

c  1+1 --> 2
c    (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0 ∧  p_984) -> (-b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0)
c  in CNF:
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_2
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨  b^{6, 165}_1
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ -p_984 ∨ -b^{6, 165}_0
c  in DIMACS:
 9617  9618 -9619 -984 -9620 0
 9617  9618 -9619 -984  9621 0
 9617  9618 -9619 -984 -9622 0

c  2+1 --> break 
c    (-b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧  p_984) -> break
c  in CNF:
c     b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 9617 -9618  9619 -984 1162 0


c  2-1 --> 1
c    (-b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧ -p_984) -> (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0)
c  in CNF:
c     b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_2
c     b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_1
c     b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨  b^{6, 165}_0
c  in DIMACS:
 9617 -9618  9619  984 -9620 0
 9617 -9618  9619  984 -9621 0
 9617 -9618  9619  984  9622 0

c  1-1 --> 0
c    (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0 ∧ -p_984) -> (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧ -b^{6, 165}_0)
c  in CNF:
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_2
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_1
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_0
c  in DIMACS:
 9617  9618 -9619  984 -9620 0
 9617  9618 -9619  984 -9621 0
 9617  9618 -9619  984 -9622 0

c  0-1 --> -1
c    (-b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧ -p_984) -> ( b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0)
c  in CNF:
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨  b^{6, 165}_2
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_1
c     b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨  b^{6, 165}_0
c  in DIMACS:
 9617  9618  9619  984  9620 0
 9617  9618  9619  984 -9621 0
 9617  9618  9619  984  9622 0

c  -1-1 --> -2
c    ( b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧  b^{6, 164}_0 ∧ -p_984) -> ( b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0)
c  in CNF:
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨  b^{6, 165}_2
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨  b^{6, 165}_1
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨  p_984 ∨ -b^{6, 165}_0
c  in DIMACS:
-9617  9618 -9619  984  9620 0
-9617  9618 -9619  984  9621 0
-9617  9618 -9619  984 -9622 0

c  -2-1 --> break 
c    ( b^{6, 164}_2 ∧  b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨  b^{6, 164}_0 ∨  p_984 ∨ break
c  in DIMACS:
-9617 -9618  9619  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 164}_2 ∧ -b^{6, 164}_1 ∧ -b^{6, 164}_0 ∧ true) 
c  in CNF:
c    -b^{6, 164}_2 ∨  b^{6, 164}_1 ∨  b^{6, 164}_0 ∨ false 
c  in DIMACS:
-9617  9618  9619  0

c  3 does not represent an automaton state.
c    -(-b^{6, 164}_2 ∧  b^{6, 164}_1 ∧  b^{6, 164}_0 ∧ true) 
c  in CNF:
c     b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ false 
c  in DIMACS:
 9617 -9618 -9619  0
c  -3 does not represent an automaton state.
c    -( b^{6, 164}_2 ∧  b^{6, 164}_1 ∧  b^{6, 164}_0 ∧ true) 
c  in CNF:
c    -b^{6, 164}_2 ∨ -b^{6, 164}_1 ∨ -b^{6, 164}_0 ∨ false 
c  in DIMACS:
-9617 -9618 -9619  0

c i = 165
c  -2+1 --> -1
c    ( b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧  p_990) -> ( b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0)
c  in CNF:
c    -b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨  b^{6, 166}_2
c    -b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_1
c    -b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨  b^{6, 166}_0
c  in DIMACS:
-9620 -9621  9622 -990  9623 0
-9620 -9621  9622 -990 -9624 0
-9620 -9621  9622 -990  9625 0

c  -1+1 --> 0
c    ( b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0 ∧  p_990) -> (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧ -b^{6, 166}_0)
c  in CNF:
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_2
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_1
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_0
c  in DIMACS:
-9620  9621 -9622 -990 -9623 0
-9620  9621 -9622 -990 -9624 0
-9620  9621 -9622 -990 -9625 0

c  0+1 --> 1
c    (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧  p_990) -> (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0)
c  in CNF:
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_2
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_1
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨  b^{6, 166}_0
c  in DIMACS:
 9620  9621  9622 -990 -9623 0
 9620  9621  9622 -990 -9624 0
 9620  9621  9622 -990  9625 0

c  1+1 --> 2
c    (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0 ∧  p_990) -> (-b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0)
c  in CNF:
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_2
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨  b^{6, 166}_1
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ -p_990 ∨ -b^{6, 166}_0
c  in DIMACS:
 9620  9621 -9622 -990 -9623 0
 9620  9621 -9622 -990  9624 0
 9620  9621 -9622 -990 -9625 0

c  2+1 --> break 
c    (-b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧  p_990) -> break
c  in CNF:
c     b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 9620 -9621  9622 -990 1162 0


c  2-1 --> 1
c    (-b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧ -p_990) -> (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0)
c  in CNF:
c     b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_2
c     b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_1
c     b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨  b^{6, 166}_0
c  in DIMACS:
 9620 -9621  9622  990 -9623 0
 9620 -9621  9622  990 -9624 0
 9620 -9621  9622  990  9625 0

c  1-1 --> 0
c    (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0 ∧ -p_990) -> (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧ -b^{6, 166}_0)
c  in CNF:
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_2
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_1
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_0
c  in DIMACS:
 9620  9621 -9622  990 -9623 0
 9620  9621 -9622  990 -9624 0
 9620  9621 -9622  990 -9625 0

c  0-1 --> -1
c    (-b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧ -p_990) -> ( b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0)
c  in CNF:
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨  b^{6, 166}_2
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_1
c     b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨  b^{6, 166}_0
c  in DIMACS:
 9620  9621  9622  990  9623 0
 9620  9621  9622  990 -9624 0
 9620  9621  9622  990  9625 0

c  -1-1 --> -2
c    ( b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧  b^{6, 165}_0 ∧ -p_990) -> ( b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0)
c  in CNF:
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨  b^{6, 166}_2
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨  b^{6, 166}_1
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨  p_990 ∨ -b^{6, 166}_0
c  in DIMACS:
-9620  9621 -9622  990  9623 0
-9620  9621 -9622  990  9624 0
-9620  9621 -9622  990 -9625 0

c  -2-1 --> break 
c    ( b^{6, 165}_2 ∧  b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨  b^{6, 165}_0 ∨  p_990 ∨ break
c  in DIMACS:
-9620 -9621  9622  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 165}_2 ∧ -b^{6, 165}_1 ∧ -b^{6, 165}_0 ∧ true) 
c  in CNF:
c    -b^{6, 165}_2 ∨  b^{6, 165}_1 ∨  b^{6, 165}_0 ∨ false 
c  in DIMACS:
-9620  9621  9622  0

c  3 does not represent an automaton state.
c    -(-b^{6, 165}_2 ∧  b^{6, 165}_1 ∧  b^{6, 165}_0 ∧ true) 
c  in CNF:
c     b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ false 
c  in DIMACS:
 9620 -9621 -9622  0
c  -3 does not represent an automaton state.
c    -( b^{6, 165}_2 ∧  b^{6, 165}_1 ∧  b^{6, 165}_0 ∧ true) 
c  in CNF:
c    -b^{6, 165}_2 ∨ -b^{6, 165}_1 ∨ -b^{6, 165}_0 ∨ false 
c  in DIMACS:
-9620 -9621 -9622  0

c i = 166
c  -2+1 --> -1
c    ( b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧  p_996) -> ( b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0)
c  in CNF:
c    -b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨  b^{6, 167}_2
c    -b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_1
c    -b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨  b^{6, 167}_0
c  in DIMACS:
-9623 -9624  9625 -996  9626 0
-9623 -9624  9625 -996 -9627 0
-9623 -9624  9625 -996  9628 0

c  -1+1 --> 0
c    ( b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0 ∧  p_996) -> (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧ -b^{6, 167}_0)
c  in CNF:
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_2
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_1
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_0
c  in DIMACS:
-9623  9624 -9625 -996 -9626 0
-9623  9624 -9625 -996 -9627 0
-9623  9624 -9625 -996 -9628 0

c  0+1 --> 1
c    (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧  p_996) -> (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0)
c  in CNF:
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_2
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_1
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨  b^{6, 167}_0
c  in DIMACS:
 9623  9624  9625 -996 -9626 0
 9623  9624  9625 -996 -9627 0
 9623  9624  9625 -996  9628 0

c  1+1 --> 2
c    (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0 ∧  p_996) -> (-b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0)
c  in CNF:
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_2
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨  b^{6, 167}_1
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ -p_996 ∨ -b^{6, 167}_0
c  in DIMACS:
 9623  9624 -9625 -996 -9626 0
 9623  9624 -9625 -996  9627 0
 9623  9624 -9625 -996 -9628 0

c  2+1 --> break 
c    (-b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧  p_996) -> break
c  in CNF:
c     b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 9623 -9624  9625 -996 1162 0


c  2-1 --> 1
c    (-b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧ -p_996) -> (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0)
c  in CNF:
c     b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_2
c     b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_1
c     b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨  b^{6, 167}_0
c  in DIMACS:
 9623 -9624  9625  996 -9626 0
 9623 -9624  9625  996 -9627 0
 9623 -9624  9625  996  9628 0

c  1-1 --> 0
c    (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0 ∧ -p_996) -> (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧ -b^{6, 167}_0)
c  in CNF:
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_2
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_1
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_0
c  in DIMACS:
 9623  9624 -9625  996 -9626 0
 9623  9624 -9625  996 -9627 0
 9623  9624 -9625  996 -9628 0

c  0-1 --> -1
c    (-b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧ -p_996) -> ( b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0)
c  in CNF:
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨  b^{6, 167}_2
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_1
c     b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨  b^{6, 167}_0
c  in DIMACS:
 9623  9624  9625  996  9626 0
 9623  9624  9625  996 -9627 0
 9623  9624  9625  996  9628 0

c  -1-1 --> -2
c    ( b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧  b^{6, 166}_0 ∧ -p_996) -> ( b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0)
c  in CNF:
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨  b^{6, 167}_2
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨  b^{6, 167}_1
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨  p_996 ∨ -b^{6, 167}_0
c  in DIMACS:
-9623  9624 -9625  996  9626 0
-9623  9624 -9625  996  9627 0
-9623  9624 -9625  996 -9628 0

c  -2-1 --> break 
c    ( b^{6, 166}_2 ∧  b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨  b^{6, 166}_0 ∨  p_996 ∨ break
c  in DIMACS:
-9623 -9624  9625  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 166}_2 ∧ -b^{6, 166}_1 ∧ -b^{6, 166}_0 ∧ true) 
c  in CNF:
c    -b^{6, 166}_2 ∨  b^{6, 166}_1 ∨  b^{6, 166}_0 ∨ false 
c  in DIMACS:
-9623  9624  9625  0

c  3 does not represent an automaton state.
c    -(-b^{6, 166}_2 ∧  b^{6, 166}_1 ∧  b^{6, 166}_0 ∧ true) 
c  in CNF:
c     b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ false 
c  in DIMACS:
 9623 -9624 -9625  0
c  -3 does not represent an automaton state.
c    -( b^{6, 166}_2 ∧  b^{6, 166}_1 ∧  b^{6, 166}_0 ∧ true) 
c  in CNF:
c    -b^{6, 166}_2 ∨ -b^{6, 166}_1 ∨ -b^{6, 166}_0 ∨ false 
c  in DIMACS:
-9623 -9624 -9625  0

c i = 167
c  -2+1 --> -1
c    ( b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧  p_1002) -> ( b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0)
c  in CNF:
c    -b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨  b^{6, 168}_2
c    -b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_1
c    -b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨  b^{6, 168}_0
c  in DIMACS:
-9626 -9627  9628 -1002  9629 0
-9626 -9627  9628 -1002 -9630 0
-9626 -9627  9628 -1002  9631 0

c  -1+1 --> 0
c    ( b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0 ∧  p_1002) -> (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧ -b^{6, 168}_0)
c  in CNF:
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_2
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_1
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_0
c  in DIMACS:
-9626  9627 -9628 -1002 -9629 0
-9626  9627 -9628 -1002 -9630 0
-9626  9627 -9628 -1002 -9631 0

c  0+1 --> 1
c    (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧  p_1002) -> (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0)
c  in CNF:
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_2
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_1
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨  b^{6, 168}_0
c  in DIMACS:
 9626  9627  9628 -1002 -9629 0
 9626  9627  9628 -1002 -9630 0
 9626  9627  9628 -1002  9631 0

c  1+1 --> 2
c    (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0 ∧  p_1002) -> (-b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0)
c  in CNF:
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_2
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨  b^{6, 168}_1
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ -p_1002 ∨ -b^{6, 168}_0
c  in DIMACS:
 9626  9627 -9628 -1002 -9629 0
 9626  9627 -9628 -1002  9630 0
 9626  9627 -9628 -1002 -9631 0

c  2+1 --> break 
c    (-b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 9626 -9627  9628 -1002 1162 0


c  2-1 --> 1
c    (-b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧ -p_1002) -> (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0)
c  in CNF:
c     b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_2
c     b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_1
c     b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨  b^{6, 168}_0
c  in DIMACS:
 9626 -9627  9628  1002 -9629 0
 9626 -9627  9628  1002 -9630 0
 9626 -9627  9628  1002  9631 0

c  1-1 --> 0
c    (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0 ∧ -p_1002) -> (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧ -b^{6, 168}_0)
c  in CNF:
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_2
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_1
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_0
c  in DIMACS:
 9626  9627 -9628  1002 -9629 0
 9626  9627 -9628  1002 -9630 0
 9626  9627 -9628  1002 -9631 0

c  0-1 --> -1
c    (-b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧ -p_1002) -> ( b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0)
c  in CNF:
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨  b^{6, 168}_2
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_1
c     b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨  b^{6, 168}_0
c  in DIMACS:
 9626  9627  9628  1002  9629 0
 9626  9627  9628  1002 -9630 0
 9626  9627  9628  1002  9631 0

c  -1-1 --> -2
c    ( b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧  b^{6, 167}_0 ∧ -p_1002) -> ( b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0)
c  in CNF:
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨  b^{6, 168}_2
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨  b^{6, 168}_1
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨  p_1002 ∨ -b^{6, 168}_0
c  in DIMACS:
-9626  9627 -9628  1002  9629 0
-9626  9627 -9628  1002  9630 0
-9626  9627 -9628  1002 -9631 0

c  -2-1 --> break 
c    ( b^{6, 167}_2 ∧  b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨  b^{6, 167}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-9626 -9627  9628  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 167}_2 ∧ -b^{6, 167}_1 ∧ -b^{6, 167}_0 ∧ true) 
c  in CNF:
c    -b^{6, 167}_2 ∨  b^{6, 167}_1 ∨  b^{6, 167}_0 ∨ false 
c  in DIMACS:
-9626  9627  9628  0

c  3 does not represent an automaton state.
c    -(-b^{6, 167}_2 ∧  b^{6, 167}_1 ∧  b^{6, 167}_0 ∧ true) 
c  in CNF:
c     b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ false 
c  in DIMACS:
 9626 -9627 -9628  0
c  -3 does not represent an automaton state.
c    -( b^{6, 167}_2 ∧  b^{6, 167}_1 ∧  b^{6, 167}_0 ∧ true) 
c  in CNF:
c    -b^{6, 167}_2 ∨ -b^{6, 167}_1 ∨ -b^{6, 167}_0 ∨ false 
c  in DIMACS:
-9626 -9627 -9628  0

c i = 168
c  -2+1 --> -1
c    ( b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧  p_1008) -> ( b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0)
c  in CNF:
c    -b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨  b^{6, 169}_2
c    -b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_1
c    -b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨  b^{6, 169}_0
c  in DIMACS:
-9629 -9630  9631 -1008  9632 0
-9629 -9630  9631 -1008 -9633 0
-9629 -9630  9631 -1008  9634 0

c  -1+1 --> 0
c    ( b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0 ∧  p_1008) -> (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧ -b^{6, 169}_0)
c  in CNF:
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_2
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_1
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_0
c  in DIMACS:
-9629  9630 -9631 -1008 -9632 0
-9629  9630 -9631 -1008 -9633 0
-9629  9630 -9631 -1008 -9634 0

c  0+1 --> 1
c    (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧  p_1008) -> (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0)
c  in CNF:
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_2
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_1
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨  b^{6, 169}_0
c  in DIMACS:
 9629  9630  9631 -1008 -9632 0
 9629  9630  9631 -1008 -9633 0
 9629  9630  9631 -1008  9634 0

c  1+1 --> 2
c    (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0 ∧  p_1008) -> (-b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0)
c  in CNF:
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_2
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨  b^{6, 169}_1
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ -p_1008 ∨ -b^{6, 169}_0
c  in DIMACS:
 9629  9630 -9631 -1008 -9632 0
 9629  9630 -9631 -1008  9633 0
 9629  9630 -9631 -1008 -9634 0

c  2+1 --> break 
c    (-b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 9629 -9630  9631 -1008 1162 0


c  2-1 --> 1
c    (-b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧ -p_1008) -> (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0)
c  in CNF:
c     b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_2
c     b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_1
c     b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨  b^{6, 169}_0
c  in DIMACS:
 9629 -9630  9631  1008 -9632 0
 9629 -9630  9631  1008 -9633 0
 9629 -9630  9631  1008  9634 0

c  1-1 --> 0
c    (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0 ∧ -p_1008) -> (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧ -b^{6, 169}_0)
c  in CNF:
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_2
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_1
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_0
c  in DIMACS:
 9629  9630 -9631  1008 -9632 0
 9629  9630 -9631  1008 -9633 0
 9629  9630 -9631  1008 -9634 0

c  0-1 --> -1
c    (-b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧ -p_1008) -> ( b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0)
c  in CNF:
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨  b^{6, 169}_2
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_1
c     b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨  b^{6, 169}_0
c  in DIMACS:
 9629  9630  9631  1008  9632 0
 9629  9630  9631  1008 -9633 0
 9629  9630  9631  1008  9634 0

c  -1-1 --> -2
c    ( b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧  b^{6, 168}_0 ∧ -p_1008) -> ( b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0)
c  in CNF:
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨  b^{6, 169}_2
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨  b^{6, 169}_1
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨  p_1008 ∨ -b^{6, 169}_0
c  in DIMACS:
-9629  9630 -9631  1008  9632 0
-9629  9630 -9631  1008  9633 0
-9629  9630 -9631  1008 -9634 0

c  -2-1 --> break 
c    ( b^{6, 168}_2 ∧  b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨  b^{6, 168}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-9629 -9630  9631  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 168}_2 ∧ -b^{6, 168}_1 ∧ -b^{6, 168}_0 ∧ true) 
c  in CNF:
c    -b^{6, 168}_2 ∨  b^{6, 168}_1 ∨  b^{6, 168}_0 ∨ false 
c  in DIMACS:
-9629  9630  9631  0

c  3 does not represent an automaton state.
c    -(-b^{6, 168}_2 ∧  b^{6, 168}_1 ∧  b^{6, 168}_0 ∧ true) 
c  in CNF:
c     b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ false 
c  in DIMACS:
 9629 -9630 -9631  0
c  -3 does not represent an automaton state.
c    -( b^{6, 168}_2 ∧  b^{6, 168}_1 ∧  b^{6, 168}_0 ∧ true) 
c  in CNF:
c    -b^{6, 168}_2 ∨ -b^{6, 168}_1 ∨ -b^{6, 168}_0 ∨ false 
c  in DIMACS:
-9629 -9630 -9631  0

c i = 169
c  -2+1 --> -1
c    ( b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧  p_1014) -> ( b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0)
c  in CNF:
c    -b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨  b^{6, 170}_2
c    -b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_1
c    -b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨  b^{6, 170}_0
c  in DIMACS:
-9632 -9633  9634 -1014  9635 0
-9632 -9633  9634 -1014 -9636 0
-9632 -9633  9634 -1014  9637 0

c  -1+1 --> 0
c    ( b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0 ∧  p_1014) -> (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧ -b^{6, 170}_0)
c  in CNF:
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_2
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_1
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_0
c  in DIMACS:
-9632  9633 -9634 -1014 -9635 0
-9632  9633 -9634 -1014 -9636 0
-9632  9633 -9634 -1014 -9637 0

c  0+1 --> 1
c    (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧  p_1014) -> (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0)
c  in CNF:
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_2
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_1
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨  b^{6, 170}_0
c  in DIMACS:
 9632  9633  9634 -1014 -9635 0
 9632  9633  9634 -1014 -9636 0
 9632  9633  9634 -1014  9637 0

c  1+1 --> 2
c    (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0 ∧  p_1014) -> (-b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0)
c  in CNF:
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_2
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨  b^{6, 170}_1
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ -p_1014 ∨ -b^{6, 170}_0
c  in DIMACS:
 9632  9633 -9634 -1014 -9635 0
 9632  9633 -9634 -1014  9636 0
 9632  9633 -9634 -1014 -9637 0

c  2+1 --> break 
c    (-b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 9632 -9633  9634 -1014 1162 0


c  2-1 --> 1
c    (-b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧ -p_1014) -> (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0)
c  in CNF:
c     b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_2
c     b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_1
c     b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨  b^{6, 170}_0
c  in DIMACS:
 9632 -9633  9634  1014 -9635 0
 9632 -9633  9634  1014 -9636 0
 9632 -9633  9634  1014  9637 0

c  1-1 --> 0
c    (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0 ∧ -p_1014) -> (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧ -b^{6, 170}_0)
c  in CNF:
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_2
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_1
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_0
c  in DIMACS:
 9632  9633 -9634  1014 -9635 0
 9632  9633 -9634  1014 -9636 0
 9632  9633 -9634  1014 -9637 0

c  0-1 --> -1
c    (-b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧ -p_1014) -> ( b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0)
c  in CNF:
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨  b^{6, 170}_2
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_1
c     b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨  b^{6, 170}_0
c  in DIMACS:
 9632  9633  9634  1014  9635 0
 9632  9633  9634  1014 -9636 0
 9632  9633  9634  1014  9637 0

c  -1-1 --> -2
c    ( b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧  b^{6, 169}_0 ∧ -p_1014) -> ( b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0)
c  in CNF:
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨  b^{6, 170}_2
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨  b^{6, 170}_1
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨  p_1014 ∨ -b^{6, 170}_0
c  in DIMACS:
-9632  9633 -9634  1014  9635 0
-9632  9633 -9634  1014  9636 0
-9632  9633 -9634  1014 -9637 0

c  -2-1 --> break 
c    ( b^{6, 169}_2 ∧  b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨  b^{6, 169}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-9632 -9633  9634  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 169}_2 ∧ -b^{6, 169}_1 ∧ -b^{6, 169}_0 ∧ true) 
c  in CNF:
c    -b^{6, 169}_2 ∨  b^{6, 169}_1 ∨  b^{6, 169}_0 ∨ false 
c  in DIMACS:
-9632  9633  9634  0

c  3 does not represent an automaton state.
c    -(-b^{6, 169}_2 ∧  b^{6, 169}_1 ∧  b^{6, 169}_0 ∧ true) 
c  in CNF:
c     b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ false 
c  in DIMACS:
 9632 -9633 -9634  0
c  -3 does not represent an automaton state.
c    -( b^{6, 169}_2 ∧  b^{6, 169}_1 ∧  b^{6, 169}_0 ∧ true) 
c  in CNF:
c    -b^{6, 169}_2 ∨ -b^{6, 169}_1 ∨ -b^{6, 169}_0 ∨ false 
c  in DIMACS:
-9632 -9633 -9634  0

c i = 170
c  -2+1 --> -1
c    ( b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧  p_1020) -> ( b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0)
c  in CNF:
c    -b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨  b^{6, 171}_2
c    -b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_1
c    -b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨  b^{6, 171}_0
c  in DIMACS:
-9635 -9636  9637 -1020  9638 0
-9635 -9636  9637 -1020 -9639 0
-9635 -9636  9637 -1020  9640 0

c  -1+1 --> 0
c    ( b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0 ∧  p_1020) -> (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧ -b^{6, 171}_0)
c  in CNF:
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_2
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_1
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_0
c  in DIMACS:
-9635  9636 -9637 -1020 -9638 0
-9635  9636 -9637 -1020 -9639 0
-9635  9636 -9637 -1020 -9640 0

c  0+1 --> 1
c    (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧  p_1020) -> (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0)
c  in CNF:
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_2
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_1
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨  b^{6, 171}_0
c  in DIMACS:
 9635  9636  9637 -1020 -9638 0
 9635  9636  9637 -1020 -9639 0
 9635  9636  9637 -1020  9640 0

c  1+1 --> 2
c    (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0 ∧  p_1020) -> (-b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0)
c  in CNF:
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_2
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨  b^{6, 171}_1
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ -p_1020 ∨ -b^{6, 171}_0
c  in DIMACS:
 9635  9636 -9637 -1020 -9638 0
 9635  9636 -9637 -1020  9639 0
 9635  9636 -9637 -1020 -9640 0

c  2+1 --> break 
c    (-b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 9635 -9636  9637 -1020 1162 0


c  2-1 --> 1
c    (-b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧ -p_1020) -> (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0)
c  in CNF:
c     b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_2
c     b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_1
c     b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨  b^{6, 171}_0
c  in DIMACS:
 9635 -9636  9637  1020 -9638 0
 9635 -9636  9637  1020 -9639 0
 9635 -9636  9637  1020  9640 0

c  1-1 --> 0
c    (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0 ∧ -p_1020) -> (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧ -b^{6, 171}_0)
c  in CNF:
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_2
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_1
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_0
c  in DIMACS:
 9635  9636 -9637  1020 -9638 0
 9635  9636 -9637  1020 -9639 0
 9635  9636 -9637  1020 -9640 0

c  0-1 --> -1
c    (-b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧ -p_1020) -> ( b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0)
c  in CNF:
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨  b^{6, 171}_2
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_1
c     b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨  b^{6, 171}_0
c  in DIMACS:
 9635  9636  9637  1020  9638 0
 9635  9636  9637  1020 -9639 0
 9635  9636  9637  1020  9640 0

c  -1-1 --> -2
c    ( b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧  b^{6, 170}_0 ∧ -p_1020) -> ( b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0)
c  in CNF:
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨  b^{6, 171}_2
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨  b^{6, 171}_1
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨  p_1020 ∨ -b^{6, 171}_0
c  in DIMACS:
-9635  9636 -9637  1020  9638 0
-9635  9636 -9637  1020  9639 0
-9635  9636 -9637  1020 -9640 0

c  -2-1 --> break 
c    ( b^{6, 170}_2 ∧  b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨  b^{6, 170}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-9635 -9636  9637  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 170}_2 ∧ -b^{6, 170}_1 ∧ -b^{6, 170}_0 ∧ true) 
c  in CNF:
c    -b^{6, 170}_2 ∨  b^{6, 170}_1 ∨  b^{6, 170}_0 ∨ false 
c  in DIMACS:
-9635  9636  9637  0

c  3 does not represent an automaton state.
c    -(-b^{6, 170}_2 ∧  b^{6, 170}_1 ∧  b^{6, 170}_0 ∧ true) 
c  in CNF:
c     b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ false 
c  in DIMACS:
 9635 -9636 -9637  0
c  -3 does not represent an automaton state.
c    -( b^{6, 170}_2 ∧  b^{6, 170}_1 ∧  b^{6, 170}_0 ∧ true) 
c  in CNF:
c    -b^{6, 170}_2 ∨ -b^{6, 170}_1 ∨ -b^{6, 170}_0 ∨ false 
c  in DIMACS:
-9635 -9636 -9637  0

c i = 171
c  -2+1 --> -1
c    ( b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧  p_1026) -> ( b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0)
c  in CNF:
c    -b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨  b^{6, 172}_2
c    -b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_1
c    -b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨  b^{6, 172}_0
c  in DIMACS:
-9638 -9639  9640 -1026  9641 0
-9638 -9639  9640 -1026 -9642 0
-9638 -9639  9640 -1026  9643 0

c  -1+1 --> 0
c    ( b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0 ∧  p_1026) -> (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧ -b^{6, 172}_0)
c  in CNF:
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_2
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_1
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_0
c  in DIMACS:
-9638  9639 -9640 -1026 -9641 0
-9638  9639 -9640 -1026 -9642 0
-9638  9639 -9640 -1026 -9643 0

c  0+1 --> 1
c    (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧  p_1026) -> (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0)
c  in CNF:
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_2
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_1
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨  b^{6, 172}_0
c  in DIMACS:
 9638  9639  9640 -1026 -9641 0
 9638  9639  9640 -1026 -9642 0
 9638  9639  9640 -1026  9643 0

c  1+1 --> 2
c    (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0 ∧  p_1026) -> (-b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0)
c  in CNF:
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_2
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨  b^{6, 172}_1
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ -p_1026 ∨ -b^{6, 172}_0
c  in DIMACS:
 9638  9639 -9640 -1026 -9641 0
 9638  9639 -9640 -1026  9642 0
 9638  9639 -9640 -1026 -9643 0

c  2+1 --> break 
c    (-b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 9638 -9639  9640 -1026 1162 0


c  2-1 --> 1
c    (-b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧ -p_1026) -> (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0)
c  in CNF:
c     b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_2
c     b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_1
c     b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨  b^{6, 172}_0
c  in DIMACS:
 9638 -9639  9640  1026 -9641 0
 9638 -9639  9640  1026 -9642 0
 9638 -9639  9640  1026  9643 0

c  1-1 --> 0
c    (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0 ∧ -p_1026) -> (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧ -b^{6, 172}_0)
c  in CNF:
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_2
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_1
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_0
c  in DIMACS:
 9638  9639 -9640  1026 -9641 0
 9638  9639 -9640  1026 -9642 0
 9638  9639 -9640  1026 -9643 0

c  0-1 --> -1
c    (-b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧ -p_1026) -> ( b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0)
c  in CNF:
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨  b^{6, 172}_2
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_1
c     b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨  b^{6, 172}_0
c  in DIMACS:
 9638  9639  9640  1026  9641 0
 9638  9639  9640  1026 -9642 0
 9638  9639  9640  1026  9643 0

c  -1-1 --> -2
c    ( b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧  b^{6, 171}_0 ∧ -p_1026) -> ( b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0)
c  in CNF:
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨  b^{6, 172}_2
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨  b^{6, 172}_1
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨  p_1026 ∨ -b^{6, 172}_0
c  in DIMACS:
-9638  9639 -9640  1026  9641 0
-9638  9639 -9640  1026  9642 0
-9638  9639 -9640  1026 -9643 0

c  -2-1 --> break 
c    ( b^{6, 171}_2 ∧  b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨  b^{6, 171}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-9638 -9639  9640  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 171}_2 ∧ -b^{6, 171}_1 ∧ -b^{6, 171}_0 ∧ true) 
c  in CNF:
c    -b^{6, 171}_2 ∨  b^{6, 171}_1 ∨  b^{6, 171}_0 ∨ false 
c  in DIMACS:
-9638  9639  9640  0

c  3 does not represent an automaton state.
c    -(-b^{6, 171}_2 ∧  b^{6, 171}_1 ∧  b^{6, 171}_0 ∧ true) 
c  in CNF:
c     b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ false 
c  in DIMACS:
 9638 -9639 -9640  0
c  -3 does not represent an automaton state.
c    -( b^{6, 171}_2 ∧  b^{6, 171}_1 ∧  b^{6, 171}_0 ∧ true) 
c  in CNF:
c    -b^{6, 171}_2 ∨ -b^{6, 171}_1 ∨ -b^{6, 171}_0 ∨ false 
c  in DIMACS:
-9638 -9639 -9640  0

c i = 172
c  -2+1 --> -1
c    ( b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧  p_1032) -> ( b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0)
c  in CNF:
c    -b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨  b^{6, 173}_2
c    -b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_1
c    -b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨  b^{6, 173}_0
c  in DIMACS:
-9641 -9642  9643 -1032  9644 0
-9641 -9642  9643 -1032 -9645 0
-9641 -9642  9643 -1032  9646 0

c  -1+1 --> 0
c    ( b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0 ∧  p_1032) -> (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧ -b^{6, 173}_0)
c  in CNF:
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_2
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_1
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_0
c  in DIMACS:
-9641  9642 -9643 -1032 -9644 0
-9641  9642 -9643 -1032 -9645 0
-9641  9642 -9643 -1032 -9646 0

c  0+1 --> 1
c    (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧  p_1032) -> (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0)
c  in CNF:
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_2
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_1
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨  b^{6, 173}_0
c  in DIMACS:
 9641  9642  9643 -1032 -9644 0
 9641  9642  9643 -1032 -9645 0
 9641  9642  9643 -1032  9646 0

c  1+1 --> 2
c    (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0 ∧  p_1032) -> (-b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0)
c  in CNF:
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_2
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨  b^{6, 173}_1
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ -p_1032 ∨ -b^{6, 173}_0
c  in DIMACS:
 9641  9642 -9643 -1032 -9644 0
 9641  9642 -9643 -1032  9645 0
 9641  9642 -9643 -1032 -9646 0

c  2+1 --> break 
c    (-b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 9641 -9642  9643 -1032 1162 0


c  2-1 --> 1
c    (-b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧ -p_1032) -> (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0)
c  in CNF:
c     b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_2
c     b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_1
c     b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨  b^{6, 173}_0
c  in DIMACS:
 9641 -9642  9643  1032 -9644 0
 9641 -9642  9643  1032 -9645 0
 9641 -9642  9643  1032  9646 0

c  1-1 --> 0
c    (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0 ∧ -p_1032) -> (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧ -b^{6, 173}_0)
c  in CNF:
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_2
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_1
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_0
c  in DIMACS:
 9641  9642 -9643  1032 -9644 0
 9641  9642 -9643  1032 -9645 0
 9641  9642 -9643  1032 -9646 0

c  0-1 --> -1
c    (-b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧ -p_1032) -> ( b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0)
c  in CNF:
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨  b^{6, 173}_2
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_1
c     b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨  b^{6, 173}_0
c  in DIMACS:
 9641  9642  9643  1032  9644 0
 9641  9642  9643  1032 -9645 0
 9641  9642  9643  1032  9646 0

c  -1-1 --> -2
c    ( b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧  b^{6, 172}_0 ∧ -p_1032) -> ( b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0)
c  in CNF:
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨  b^{6, 173}_2
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨  b^{6, 173}_1
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨  p_1032 ∨ -b^{6, 173}_0
c  in DIMACS:
-9641  9642 -9643  1032  9644 0
-9641  9642 -9643  1032  9645 0
-9641  9642 -9643  1032 -9646 0

c  -2-1 --> break 
c    ( b^{6, 172}_2 ∧  b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨  b^{6, 172}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-9641 -9642  9643  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 172}_2 ∧ -b^{6, 172}_1 ∧ -b^{6, 172}_0 ∧ true) 
c  in CNF:
c    -b^{6, 172}_2 ∨  b^{6, 172}_1 ∨  b^{6, 172}_0 ∨ false 
c  in DIMACS:
-9641  9642  9643  0

c  3 does not represent an automaton state.
c    -(-b^{6, 172}_2 ∧  b^{6, 172}_1 ∧  b^{6, 172}_0 ∧ true) 
c  in CNF:
c     b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ false 
c  in DIMACS:
 9641 -9642 -9643  0
c  -3 does not represent an automaton state.
c    -( b^{6, 172}_2 ∧  b^{6, 172}_1 ∧  b^{6, 172}_0 ∧ true) 
c  in CNF:
c    -b^{6, 172}_2 ∨ -b^{6, 172}_1 ∨ -b^{6, 172}_0 ∨ false 
c  in DIMACS:
-9641 -9642 -9643  0

c i = 173
c  -2+1 --> -1
c    ( b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧  p_1038) -> ( b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0)
c  in CNF:
c    -b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨  b^{6, 174}_2
c    -b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_1
c    -b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨  b^{6, 174}_0
c  in DIMACS:
-9644 -9645  9646 -1038  9647 0
-9644 -9645  9646 -1038 -9648 0
-9644 -9645  9646 -1038  9649 0

c  -1+1 --> 0
c    ( b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0 ∧  p_1038) -> (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧ -b^{6, 174}_0)
c  in CNF:
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_2
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_1
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_0
c  in DIMACS:
-9644  9645 -9646 -1038 -9647 0
-9644  9645 -9646 -1038 -9648 0
-9644  9645 -9646 -1038 -9649 0

c  0+1 --> 1
c    (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧  p_1038) -> (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0)
c  in CNF:
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_2
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_1
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨  b^{6, 174}_0
c  in DIMACS:
 9644  9645  9646 -1038 -9647 0
 9644  9645  9646 -1038 -9648 0
 9644  9645  9646 -1038  9649 0

c  1+1 --> 2
c    (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0 ∧  p_1038) -> (-b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0)
c  in CNF:
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_2
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨  b^{6, 174}_1
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ -p_1038 ∨ -b^{6, 174}_0
c  in DIMACS:
 9644  9645 -9646 -1038 -9647 0
 9644  9645 -9646 -1038  9648 0
 9644  9645 -9646 -1038 -9649 0

c  2+1 --> break 
c    (-b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 9644 -9645  9646 -1038 1162 0


c  2-1 --> 1
c    (-b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧ -p_1038) -> (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0)
c  in CNF:
c     b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_2
c     b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_1
c     b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨  b^{6, 174}_0
c  in DIMACS:
 9644 -9645  9646  1038 -9647 0
 9644 -9645  9646  1038 -9648 0
 9644 -9645  9646  1038  9649 0

c  1-1 --> 0
c    (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0 ∧ -p_1038) -> (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧ -b^{6, 174}_0)
c  in CNF:
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_2
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_1
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_0
c  in DIMACS:
 9644  9645 -9646  1038 -9647 0
 9644  9645 -9646  1038 -9648 0
 9644  9645 -9646  1038 -9649 0

c  0-1 --> -1
c    (-b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧ -p_1038) -> ( b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0)
c  in CNF:
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨  b^{6, 174}_2
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_1
c     b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨  b^{6, 174}_0
c  in DIMACS:
 9644  9645  9646  1038  9647 0
 9644  9645  9646  1038 -9648 0
 9644  9645  9646  1038  9649 0

c  -1-1 --> -2
c    ( b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧  b^{6, 173}_0 ∧ -p_1038) -> ( b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0)
c  in CNF:
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨  b^{6, 174}_2
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨  b^{6, 174}_1
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨  p_1038 ∨ -b^{6, 174}_0
c  in DIMACS:
-9644  9645 -9646  1038  9647 0
-9644  9645 -9646  1038  9648 0
-9644  9645 -9646  1038 -9649 0

c  -2-1 --> break 
c    ( b^{6, 173}_2 ∧  b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨  b^{6, 173}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-9644 -9645  9646  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 173}_2 ∧ -b^{6, 173}_1 ∧ -b^{6, 173}_0 ∧ true) 
c  in CNF:
c    -b^{6, 173}_2 ∨  b^{6, 173}_1 ∨  b^{6, 173}_0 ∨ false 
c  in DIMACS:
-9644  9645  9646  0

c  3 does not represent an automaton state.
c    -(-b^{6, 173}_2 ∧  b^{6, 173}_1 ∧  b^{6, 173}_0 ∧ true) 
c  in CNF:
c     b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ false 
c  in DIMACS:
 9644 -9645 -9646  0
c  -3 does not represent an automaton state.
c    -( b^{6, 173}_2 ∧  b^{6, 173}_1 ∧  b^{6, 173}_0 ∧ true) 
c  in CNF:
c    -b^{6, 173}_2 ∨ -b^{6, 173}_1 ∨ -b^{6, 173}_0 ∨ false 
c  in DIMACS:
-9644 -9645 -9646  0

c i = 174
c  -2+1 --> -1
c    ( b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧  p_1044) -> ( b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0)
c  in CNF:
c    -b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨  b^{6, 175}_2
c    -b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_1
c    -b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨  b^{6, 175}_0
c  in DIMACS:
-9647 -9648  9649 -1044  9650 0
-9647 -9648  9649 -1044 -9651 0
-9647 -9648  9649 -1044  9652 0

c  -1+1 --> 0
c    ( b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0 ∧  p_1044) -> (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧ -b^{6, 175}_0)
c  in CNF:
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_2
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_1
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_0
c  in DIMACS:
-9647  9648 -9649 -1044 -9650 0
-9647  9648 -9649 -1044 -9651 0
-9647  9648 -9649 -1044 -9652 0

c  0+1 --> 1
c    (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧  p_1044) -> (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0)
c  in CNF:
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_2
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_1
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨  b^{6, 175}_0
c  in DIMACS:
 9647  9648  9649 -1044 -9650 0
 9647  9648  9649 -1044 -9651 0
 9647  9648  9649 -1044  9652 0

c  1+1 --> 2
c    (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0 ∧  p_1044) -> (-b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0)
c  in CNF:
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_2
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨  b^{6, 175}_1
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ -p_1044 ∨ -b^{6, 175}_0
c  in DIMACS:
 9647  9648 -9649 -1044 -9650 0
 9647  9648 -9649 -1044  9651 0
 9647  9648 -9649 -1044 -9652 0

c  2+1 --> break 
c    (-b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 9647 -9648  9649 -1044 1162 0


c  2-1 --> 1
c    (-b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧ -p_1044) -> (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0)
c  in CNF:
c     b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_2
c     b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_1
c     b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨  b^{6, 175}_0
c  in DIMACS:
 9647 -9648  9649  1044 -9650 0
 9647 -9648  9649  1044 -9651 0
 9647 -9648  9649  1044  9652 0

c  1-1 --> 0
c    (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0 ∧ -p_1044) -> (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧ -b^{6, 175}_0)
c  in CNF:
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_2
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_1
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_0
c  in DIMACS:
 9647  9648 -9649  1044 -9650 0
 9647  9648 -9649  1044 -9651 0
 9647  9648 -9649  1044 -9652 0

c  0-1 --> -1
c    (-b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧ -p_1044) -> ( b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0)
c  in CNF:
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨  b^{6, 175}_2
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_1
c     b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨  b^{6, 175}_0
c  in DIMACS:
 9647  9648  9649  1044  9650 0
 9647  9648  9649  1044 -9651 0
 9647  9648  9649  1044  9652 0

c  -1-1 --> -2
c    ( b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧  b^{6, 174}_0 ∧ -p_1044) -> ( b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0)
c  in CNF:
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨  b^{6, 175}_2
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨  b^{6, 175}_1
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨  p_1044 ∨ -b^{6, 175}_0
c  in DIMACS:
-9647  9648 -9649  1044  9650 0
-9647  9648 -9649  1044  9651 0
-9647  9648 -9649  1044 -9652 0

c  -2-1 --> break 
c    ( b^{6, 174}_2 ∧  b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨  b^{6, 174}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-9647 -9648  9649  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 174}_2 ∧ -b^{6, 174}_1 ∧ -b^{6, 174}_0 ∧ true) 
c  in CNF:
c    -b^{6, 174}_2 ∨  b^{6, 174}_1 ∨  b^{6, 174}_0 ∨ false 
c  in DIMACS:
-9647  9648  9649  0

c  3 does not represent an automaton state.
c    -(-b^{6, 174}_2 ∧  b^{6, 174}_1 ∧  b^{6, 174}_0 ∧ true) 
c  in CNF:
c     b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ false 
c  in DIMACS:
 9647 -9648 -9649  0
c  -3 does not represent an automaton state.
c    -( b^{6, 174}_2 ∧  b^{6, 174}_1 ∧  b^{6, 174}_0 ∧ true) 
c  in CNF:
c    -b^{6, 174}_2 ∨ -b^{6, 174}_1 ∨ -b^{6, 174}_0 ∨ false 
c  in DIMACS:
-9647 -9648 -9649  0

c i = 175
c  -2+1 --> -1
c    ( b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧  p_1050) -> ( b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0)
c  in CNF:
c    -b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨  b^{6, 176}_2
c    -b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_1
c    -b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨  b^{6, 176}_0
c  in DIMACS:
-9650 -9651  9652 -1050  9653 0
-9650 -9651  9652 -1050 -9654 0
-9650 -9651  9652 -1050  9655 0

c  -1+1 --> 0
c    ( b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0 ∧  p_1050) -> (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧ -b^{6, 176}_0)
c  in CNF:
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_2
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_1
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_0
c  in DIMACS:
-9650  9651 -9652 -1050 -9653 0
-9650  9651 -9652 -1050 -9654 0
-9650  9651 -9652 -1050 -9655 0

c  0+1 --> 1
c    (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧  p_1050) -> (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0)
c  in CNF:
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_2
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_1
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨  b^{6, 176}_0
c  in DIMACS:
 9650  9651  9652 -1050 -9653 0
 9650  9651  9652 -1050 -9654 0
 9650  9651  9652 -1050  9655 0

c  1+1 --> 2
c    (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0 ∧  p_1050) -> (-b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0)
c  in CNF:
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_2
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨  b^{6, 176}_1
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ -p_1050 ∨ -b^{6, 176}_0
c  in DIMACS:
 9650  9651 -9652 -1050 -9653 0
 9650  9651 -9652 -1050  9654 0
 9650  9651 -9652 -1050 -9655 0

c  2+1 --> break 
c    (-b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 9650 -9651  9652 -1050 1162 0


c  2-1 --> 1
c    (-b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧ -p_1050) -> (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0)
c  in CNF:
c     b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_2
c     b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_1
c     b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨  b^{6, 176}_0
c  in DIMACS:
 9650 -9651  9652  1050 -9653 0
 9650 -9651  9652  1050 -9654 0
 9650 -9651  9652  1050  9655 0

c  1-1 --> 0
c    (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0 ∧ -p_1050) -> (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧ -b^{6, 176}_0)
c  in CNF:
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_2
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_1
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_0
c  in DIMACS:
 9650  9651 -9652  1050 -9653 0
 9650  9651 -9652  1050 -9654 0
 9650  9651 -9652  1050 -9655 0

c  0-1 --> -1
c    (-b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧ -p_1050) -> ( b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0)
c  in CNF:
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨  b^{6, 176}_2
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_1
c     b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨  b^{6, 176}_0
c  in DIMACS:
 9650  9651  9652  1050  9653 0
 9650  9651  9652  1050 -9654 0
 9650  9651  9652  1050  9655 0

c  -1-1 --> -2
c    ( b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧  b^{6, 175}_0 ∧ -p_1050) -> ( b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0)
c  in CNF:
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨  b^{6, 176}_2
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨  b^{6, 176}_1
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨  p_1050 ∨ -b^{6, 176}_0
c  in DIMACS:
-9650  9651 -9652  1050  9653 0
-9650  9651 -9652  1050  9654 0
-9650  9651 -9652  1050 -9655 0

c  -2-1 --> break 
c    ( b^{6, 175}_2 ∧  b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨  b^{6, 175}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-9650 -9651  9652  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 175}_2 ∧ -b^{6, 175}_1 ∧ -b^{6, 175}_0 ∧ true) 
c  in CNF:
c    -b^{6, 175}_2 ∨  b^{6, 175}_1 ∨  b^{6, 175}_0 ∨ false 
c  in DIMACS:
-9650  9651  9652  0

c  3 does not represent an automaton state.
c    -(-b^{6, 175}_2 ∧  b^{6, 175}_1 ∧  b^{6, 175}_0 ∧ true) 
c  in CNF:
c     b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ false 
c  in DIMACS:
 9650 -9651 -9652  0
c  -3 does not represent an automaton state.
c    -( b^{6, 175}_2 ∧  b^{6, 175}_1 ∧  b^{6, 175}_0 ∧ true) 
c  in CNF:
c    -b^{6, 175}_2 ∨ -b^{6, 175}_1 ∨ -b^{6, 175}_0 ∨ false 
c  in DIMACS:
-9650 -9651 -9652  0

c i = 176
c  -2+1 --> -1
c    ( b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧  p_1056) -> ( b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0)
c  in CNF:
c    -b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨  b^{6, 177}_2
c    -b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_1
c    -b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨  b^{6, 177}_0
c  in DIMACS:
-9653 -9654  9655 -1056  9656 0
-9653 -9654  9655 -1056 -9657 0
-9653 -9654  9655 -1056  9658 0

c  -1+1 --> 0
c    ( b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0 ∧  p_1056) -> (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧ -b^{6, 177}_0)
c  in CNF:
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_2
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_1
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_0
c  in DIMACS:
-9653  9654 -9655 -1056 -9656 0
-9653  9654 -9655 -1056 -9657 0
-9653  9654 -9655 -1056 -9658 0

c  0+1 --> 1
c    (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧  p_1056) -> (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0)
c  in CNF:
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_2
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_1
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨  b^{6, 177}_0
c  in DIMACS:
 9653  9654  9655 -1056 -9656 0
 9653  9654  9655 -1056 -9657 0
 9653  9654  9655 -1056  9658 0

c  1+1 --> 2
c    (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0 ∧  p_1056) -> (-b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0)
c  in CNF:
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_2
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨  b^{6, 177}_1
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ -p_1056 ∨ -b^{6, 177}_0
c  in DIMACS:
 9653  9654 -9655 -1056 -9656 0
 9653  9654 -9655 -1056  9657 0
 9653  9654 -9655 -1056 -9658 0

c  2+1 --> break 
c    (-b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 9653 -9654  9655 -1056 1162 0


c  2-1 --> 1
c    (-b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧ -p_1056) -> (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0)
c  in CNF:
c     b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_2
c     b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_1
c     b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨  b^{6, 177}_0
c  in DIMACS:
 9653 -9654  9655  1056 -9656 0
 9653 -9654  9655  1056 -9657 0
 9653 -9654  9655  1056  9658 0

c  1-1 --> 0
c    (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0 ∧ -p_1056) -> (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧ -b^{6, 177}_0)
c  in CNF:
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_2
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_1
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_0
c  in DIMACS:
 9653  9654 -9655  1056 -9656 0
 9653  9654 -9655  1056 -9657 0
 9653  9654 -9655  1056 -9658 0

c  0-1 --> -1
c    (-b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧ -p_1056) -> ( b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0)
c  in CNF:
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨  b^{6, 177}_2
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_1
c     b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨  b^{6, 177}_0
c  in DIMACS:
 9653  9654  9655  1056  9656 0
 9653  9654  9655  1056 -9657 0
 9653  9654  9655  1056  9658 0

c  -1-1 --> -2
c    ( b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧  b^{6, 176}_0 ∧ -p_1056) -> ( b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0)
c  in CNF:
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨  b^{6, 177}_2
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨  b^{6, 177}_1
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨  p_1056 ∨ -b^{6, 177}_0
c  in DIMACS:
-9653  9654 -9655  1056  9656 0
-9653  9654 -9655  1056  9657 0
-9653  9654 -9655  1056 -9658 0

c  -2-1 --> break 
c    ( b^{6, 176}_2 ∧  b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨  b^{6, 176}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-9653 -9654  9655  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 176}_2 ∧ -b^{6, 176}_1 ∧ -b^{6, 176}_0 ∧ true) 
c  in CNF:
c    -b^{6, 176}_2 ∨  b^{6, 176}_1 ∨  b^{6, 176}_0 ∨ false 
c  in DIMACS:
-9653  9654  9655  0

c  3 does not represent an automaton state.
c    -(-b^{6, 176}_2 ∧  b^{6, 176}_1 ∧  b^{6, 176}_0 ∧ true) 
c  in CNF:
c     b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ false 
c  in DIMACS:
 9653 -9654 -9655  0
c  -3 does not represent an automaton state.
c    -( b^{6, 176}_2 ∧  b^{6, 176}_1 ∧  b^{6, 176}_0 ∧ true) 
c  in CNF:
c    -b^{6, 176}_2 ∨ -b^{6, 176}_1 ∨ -b^{6, 176}_0 ∨ false 
c  in DIMACS:
-9653 -9654 -9655  0

c i = 177
c  -2+1 --> -1
c    ( b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧  p_1062) -> ( b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0)
c  in CNF:
c    -b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨  b^{6, 178}_2
c    -b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_1
c    -b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨  b^{6, 178}_0
c  in DIMACS:
-9656 -9657  9658 -1062  9659 0
-9656 -9657  9658 -1062 -9660 0
-9656 -9657  9658 -1062  9661 0

c  -1+1 --> 0
c    ( b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0 ∧  p_1062) -> (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧ -b^{6, 178}_0)
c  in CNF:
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_2
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_1
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_0
c  in DIMACS:
-9656  9657 -9658 -1062 -9659 0
-9656  9657 -9658 -1062 -9660 0
-9656  9657 -9658 -1062 -9661 0

c  0+1 --> 1
c    (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧  p_1062) -> (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0)
c  in CNF:
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_2
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_1
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨  b^{6, 178}_0
c  in DIMACS:
 9656  9657  9658 -1062 -9659 0
 9656  9657  9658 -1062 -9660 0
 9656  9657  9658 -1062  9661 0

c  1+1 --> 2
c    (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0 ∧  p_1062) -> (-b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0)
c  in CNF:
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_2
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨  b^{6, 178}_1
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ -p_1062 ∨ -b^{6, 178}_0
c  in DIMACS:
 9656  9657 -9658 -1062 -9659 0
 9656  9657 -9658 -1062  9660 0
 9656  9657 -9658 -1062 -9661 0

c  2+1 --> break 
c    (-b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 9656 -9657  9658 -1062 1162 0


c  2-1 --> 1
c    (-b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧ -p_1062) -> (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0)
c  in CNF:
c     b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_2
c     b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_1
c     b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨  b^{6, 178}_0
c  in DIMACS:
 9656 -9657  9658  1062 -9659 0
 9656 -9657  9658  1062 -9660 0
 9656 -9657  9658  1062  9661 0

c  1-1 --> 0
c    (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0 ∧ -p_1062) -> (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧ -b^{6, 178}_0)
c  in CNF:
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_2
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_1
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_0
c  in DIMACS:
 9656  9657 -9658  1062 -9659 0
 9656  9657 -9658  1062 -9660 0
 9656  9657 -9658  1062 -9661 0

c  0-1 --> -1
c    (-b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧ -p_1062) -> ( b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0)
c  in CNF:
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨  b^{6, 178}_2
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_1
c     b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨  b^{6, 178}_0
c  in DIMACS:
 9656  9657  9658  1062  9659 0
 9656  9657  9658  1062 -9660 0
 9656  9657  9658  1062  9661 0

c  -1-1 --> -2
c    ( b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧  b^{6, 177}_0 ∧ -p_1062) -> ( b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0)
c  in CNF:
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨  b^{6, 178}_2
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨  b^{6, 178}_1
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨  p_1062 ∨ -b^{6, 178}_0
c  in DIMACS:
-9656  9657 -9658  1062  9659 0
-9656  9657 -9658  1062  9660 0
-9656  9657 -9658  1062 -9661 0

c  -2-1 --> break 
c    ( b^{6, 177}_2 ∧  b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨  b^{6, 177}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-9656 -9657  9658  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 177}_2 ∧ -b^{6, 177}_1 ∧ -b^{6, 177}_0 ∧ true) 
c  in CNF:
c    -b^{6, 177}_2 ∨  b^{6, 177}_1 ∨  b^{6, 177}_0 ∨ false 
c  in DIMACS:
-9656  9657  9658  0

c  3 does not represent an automaton state.
c    -(-b^{6, 177}_2 ∧  b^{6, 177}_1 ∧  b^{6, 177}_0 ∧ true) 
c  in CNF:
c     b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ false 
c  in DIMACS:
 9656 -9657 -9658  0
c  -3 does not represent an automaton state.
c    -( b^{6, 177}_2 ∧  b^{6, 177}_1 ∧  b^{6, 177}_0 ∧ true) 
c  in CNF:
c    -b^{6, 177}_2 ∨ -b^{6, 177}_1 ∨ -b^{6, 177}_0 ∨ false 
c  in DIMACS:
-9656 -9657 -9658  0

c i = 178
c  -2+1 --> -1
c    ( b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧  p_1068) -> ( b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0)
c  in CNF:
c    -b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨  b^{6, 179}_2
c    -b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_1
c    -b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨  b^{6, 179}_0
c  in DIMACS:
-9659 -9660  9661 -1068  9662 0
-9659 -9660  9661 -1068 -9663 0
-9659 -9660  9661 -1068  9664 0

c  -1+1 --> 0
c    ( b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0 ∧  p_1068) -> (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧ -b^{6, 179}_0)
c  in CNF:
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_2
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_1
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_0
c  in DIMACS:
-9659  9660 -9661 -1068 -9662 0
-9659  9660 -9661 -1068 -9663 0
-9659  9660 -9661 -1068 -9664 0

c  0+1 --> 1
c    (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧  p_1068) -> (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0)
c  in CNF:
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_2
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_1
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨  b^{6, 179}_0
c  in DIMACS:
 9659  9660  9661 -1068 -9662 0
 9659  9660  9661 -1068 -9663 0
 9659  9660  9661 -1068  9664 0

c  1+1 --> 2
c    (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0 ∧  p_1068) -> (-b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0)
c  in CNF:
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_2
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨  b^{6, 179}_1
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ -p_1068 ∨ -b^{6, 179}_0
c  in DIMACS:
 9659  9660 -9661 -1068 -9662 0
 9659  9660 -9661 -1068  9663 0
 9659  9660 -9661 -1068 -9664 0

c  2+1 --> break 
c    (-b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 9659 -9660  9661 -1068 1162 0


c  2-1 --> 1
c    (-b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧ -p_1068) -> (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0)
c  in CNF:
c     b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_2
c     b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_1
c     b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨  b^{6, 179}_0
c  in DIMACS:
 9659 -9660  9661  1068 -9662 0
 9659 -9660  9661  1068 -9663 0
 9659 -9660  9661  1068  9664 0

c  1-1 --> 0
c    (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0 ∧ -p_1068) -> (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧ -b^{6, 179}_0)
c  in CNF:
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_2
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_1
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_0
c  in DIMACS:
 9659  9660 -9661  1068 -9662 0
 9659  9660 -9661  1068 -9663 0
 9659  9660 -9661  1068 -9664 0

c  0-1 --> -1
c    (-b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧ -p_1068) -> ( b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0)
c  in CNF:
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨  b^{6, 179}_2
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_1
c     b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨  b^{6, 179}_0
c  in DIMACS:
 9659  9660  9661  1068  9662 0
 9659  9660  9661  1068 -9663 0
 9659  9660  9661  1068  9664 0

c  -1-1 --> -2
c    ( b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧  b^{6, 178}_0 ∧ -p_1068) -> ( b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0)
c  in CNF:
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨  b^{6, 179}_2
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨  b^{6, 179}_1
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨  p_1068 ∨ -b^{6, 179}_0
c  in DIMACS:
-9659  9660 -9661  1068  9662 0
-9659  9660 -9661  1068  9663 0
-9659  9660 -9661  1068 -9664 0

c  -2-1 --> break 
c    ( b^{6, 178}_2 ∧  b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨  b^{6, 178}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-9659 -9660  9661  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 178}_2 ∧ -b^{6, 178}_1 ∧ -b^{6, 178}_0 ∧ true) 
c  in CNF:
c    -b^{6, 178}_2 ∨  b^{6, 178}_1 ∨  b^{6, 178}_0 ∨ false 
c  in DIMACS:
-9659  9660  9661  0

c  3 does not represent an automaton state.
c    -(-b^{6, 178}_2 ∧  b^{6, 178}_1 ∧  b^{6, 178}_0 ∧ true) 
c  in CNF:
c     b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ false 
c  in DIMACS:
 9659 -9660 -9661  0
c  -3 does not represent an automaton state.
c    -( b^{6, 178}_2 ∧  b^{6, 178}_1 ∧  b^{6, 178}_0 ∧ true) 
c  in CNF:
c    -b^{6, 178}_2 ∨ -b^{6, 178}_1 ∨ -b^{6, 178}_0 ∨ false 
c  in DIMACS:
-9659 -9660 -9661  0

c i = 179
c  -2+1 --> -1
c    ( b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧  p_1074) -> ( b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0)
c  in CNF:
c    -b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨  b^{6, 180}_2
c    -b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_1
c    -b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨  b^{6, 180}_0
c  in DIMACS:
-9662 -9663  9664 -1074  9665 0
-9662 -9663  9664 -1074 -9666 0
-9662 -9663  9664 -1074  9667 0

c  -1+1 --> 0
c    ( b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0 ∧  p_1074) -> (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧ -b^{6, 180}_0)
c  in CNF:
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_2
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_1
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_0
c  in DIMACS:
-9662  9663 -9664 -1074 -9665 0
-9662  9663 -9664 -1074 -9666 0
-9662  9663 -9664 -1074 -9667 0

c  0+1 --> 1
c    (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧  p_1074) -> (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0)
c  in CNF:
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_2
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_1
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨  b^{6, 180}_0
c  in DIMACS:
 9662  9663  9664 -1074 -9665 0
 9662  9663  9664 -1074 -9666 0
 9662  9663  9664 -1074  9667 0

c  1+1 --> 2
c    (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0 ∧  p_1074) -> (-b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0)
c  in CNF:
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_2
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨  b^{6, 180}_1
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ -p_1074 ∨ -b^{6, 180}_0
c  in DIMACS:
 9662  9663 -9664 -1074 -9665 0
 9662  9663 -9664 -1074  9666 0
 9662  9663 -9664 -1074 -9667 0

c  2+1 --> break 
c    (-b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 9662 -9663  9664 -1074 1162 0


c  2-1 --> 1
c    (-b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧ -p_1074) -> (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0)
c  in CNF:
c     b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_2
c     b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_1
c     b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨  b^{6, 180}_0
c  in DIMACS:
 9662 -9663  9664  1074 -9665 0
 9662 -9663  9664  1074 -9666 0
 9662 -9663  9664  1074  9667 0

c  1-1 --> 0
c    (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0 ∧ -p_1074) -> (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧ -b^{6, 180}_0)
c  in CNF:
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_2
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_1
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_0
c  in DIMACS:
 9662  9663 -9664  1074 -9665 0
 9662  9663 -9664  1074 -9666 0
 9662  9663 -9664  1074 -9667 0

c  0-1 --> -1
c    (-b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧ -p_1074) -> ( b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0)
c  in CNF:
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨  b^{6, 180}_2
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_1
c     b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨  b^{6, 180}_0
c  in DIMACS:
 9662  9663  9664  1074  9665 0
 9662  9663  9664  1074 -9666 0
 9662  9663  9664  1074  9667 0

c  -1-1 --> -2
c    ( b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧  b^{6, 179}_0 ∧ -p_1074) -> ( b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0)
c  in CNF:
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨  b^{6, 180}_2
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨  b^{6, 180}_1
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨  p_1074 ∨ -b^{6, 180}_0
c  in DIMACS:
-9662  9663 -9664  1074  9665 0
-9662  9663 -9664  1074  9666 0
-9662  9663 -9664  1074 -9667 0

c  -2-1 --> break 
c    ( b^{6, 179}_2 ∧  b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨  b^{6, 179}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-9662 -9663  9664  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 179}_2 ∧ -b^{6, 179}_1 ∧ -b^{6, 179}_0 ∧ true) 
c  in CNF:
c    -b^{6, 179}_2 ∨  b^{6, 179}_1 ∨  b^{6, 179}_0 ∨ false 
c  in DIMACS:
-9662  9663  9664  0

c  3 does not represent an automaton state.
c    -(-b^{6, 179}_2 ∧  b^{6, 179}_1 ∧  b^{6, 179}_0 ∧ true) 
c  in CNF:
c     b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ false 
c  in DIMACS:
 9662 -9663 -9664  0
c  -3 does not represent an automaton state.
c    -( b^{6, 179}_2 ∧  b^{6, 179}_1 ∧  b^{6, 179}_0 ∧ true) 
c  in CNF:
c    -b^{6, 179}_2 ∨ -b^{6, 179}_1 ∨ -b^{6, 179}_0 ∨ false 
c  in DIMACS:
-9662 -9663 -9664  0

c i = 180
c  -2+1 --> -1
c    ( b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧  p_1080) -> ( b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0)
c  in CNF:
c    -b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨  b^{6, 181}_2
c    -b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_1
c    -b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨  b^{6, 181}_0
c  in DIMACS:
-9665 -9666  9667 -1080  9668 0
-9665 -9666  9667 -1080 -9669 0
-9665 -9666  9667 -1080  9670 0

c  -1+1 --> 0
c    ( b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0 ∧  p_1080) -> (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧ -b^{6, 181}_0)
c  in CNF:
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_2
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_1
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_0
c  in DIMACS:
-9665  9666 -9667 -1080 -9668 0
-9665  9666 -9667 -1080 -9669 0
-9665  9666 -9667 -1080 -9670 0

c  0+1 --> 1
c    (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧  p_1080) -> (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0)
c  in CNF:
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_2
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_1
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨  b^{6, 181}_0
c  in DIMACS:
 9665  9666  9667 -1080 -9668 0
 9665  9666  9667 -1080 -9669 0
 9665  9666  9667 -1080  9670 0

c  1+1 --> 2
c    (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0 ∧  p_1080) -> (-b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0)
c  in CNF:
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_2
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨  b^{6, 181}_1
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ -p_1080 ∨ -b^{6, 181}_0
c  in DIMACS:
 9665  9666 -9667 -1080 -9668 0
 9665  9666 -9667 -1080  9669 0
 9665  9666 -9667 -1080 -9670 0

c  2+1 --> break 
c    (-b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 9665 -9666  9667 -1080 1162 0


c  2-1 --> 1
c    (-b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧ -p_1080) -> (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0)
c  in CNF:
c     b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_2
c     b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_1
c     b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨  b^{6, 181}_0
c  in DIMACS:
 9665 -9666  9667  1080 -9668 0
 9665 -9666  9667  1080 -9669 0
 9665 -9666  9667  1080  9670 0

c  1-1 --> 0
c    (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0 ∧ -p_1080) -> (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧ -b^{6, 181}_0)
c  in CNF:
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_2
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_1
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_0
c  in DIMACS:
 9665  9666 -9667  1080 -9668 0
 9665  9666 -9667  1080 -9669 0
 9665  9666 -9667  1080 -9670 0

c  0-1 --> -1
c    (-b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧ -p_1080) -> ( b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0)
c  in CNF:
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨  b^{6, 181}_2
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_1
c     b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨  b^{6, 181}_0
c  in DIMACS:
 9665  9666  9667  1080  9668 0
 9665  9666  9667  1080 -9669 0
 9665  9666  9667  1080  9670 0

c  -1-1 --> -2
c    ( b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧  b^{6, 180}_0 ∧ -p_1080) -> ( b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0)
c  in CNF:
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨  b^{6, 181}_2
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨  b^{6, 181}_1
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨  p_1080 ∨ -b^{6, 181}_0
c  in DIMACS:
-9665  9666 -9667  1080  9668 0
-9665  9666 -9667  1080  9669 0
-9665  9666 -9667  1080 -9670 0

c  -2-1 --> break 
c    ( b^{6, 180}_2 ∧  b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨  b^{6, 180}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-9665 -9666  9667  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 180}_2 ∧ -b^{6, 180}_1 ∧ -b^{6, 180}_0 ∧ true) 
c  in CNF:
c    -b^{6, 180}_2 ∨  b^{6, 180}_1 ∨  b^{6, 180}_0 ∨ false 
c  in DIMACS:
-9665  9666  9667  0

c  3 does not represent an automaton state.
c    -(-b^{6, 180}_2 ∧  b^{6, 180}_1 ∧  b^{6, 180}_0 ∧ true) 
c  in CNF:
c     b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ false 
c  in DIMACS:
 9665 -9666 -9667  0
c  -3 does not represent an automaton state.
c    -( b^{6, 180}_2 ∧  b^{6, 180}_1 ∧  b^{6, 180}_0 ∧ true) 
c  in CNF:
c    -b^{6, 180}_2 ∨ -b^{6, 180}_1 ∨ -b^{6, 180}_0 ∨ false 
c  in DIMACS:
-9665 -9666 -9667  0

c i = 181
c  -2+1 --> -1
c    ( b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧  p_1086) -> ( b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0)
c  in CNF:
c    -b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨  b^{6, 182}_2
c    -b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_1
c    -b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨  b^{6, 182}_0
c  in DIMACS:
-9668 -9669  9670 -1086  9671 0
-9668 -9669  9670 -1086 -9672 0
-9668 -9669  9670 -1086  9673 0

c  -1+1 --> 0
c    ( b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0 ∧  p_1086) -> (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧ -b^{6, 182}_0)
c  in CNF:
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_2
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_1
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_0
c  in DIMACS:
-9668  9669 -9670 -1086 -9671 0
-9668  9669 -9670 -1086 -9672 0
-9668  9669 -9670 -1086 -9673 0

c  0+1 --> 1
c    (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧  p_1086) -> (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0)
c  in CNF:
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_2
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_1
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨  b^{6, 182}_0
c  in DIMACS:
 9668  9669  9670 -1086 -9671 0
 9668  9669  9670 -1086 -9672 0
 9668  9669  9670 -1086  9673 0

c  1+1 --> 2
c    (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0 ∧  p_1086) -> (-b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0)
c  in CNF:
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_2
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨  b^{6, 182}_1
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ -p_1086 ∨ -b^{6, 182}_0
c  in DIMACS:
 9668  9669 -9670 -1086 -9671 0
 9668  9669 -9670 -1086  9672 0
 9668  9669 -9670 -1086 -9673 0

c  2+1 --> break 
c    (-b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 9668 -9669  9670 -1086 1162 0


c  2-1 --> 1
c    (-b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧ -p_1086) -> (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0)
c  in CNF:
c     b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_2
c     b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_1
c     b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨  b^{6, 182}_0
c  in DIMACS:
 9668 -9669  9670  1086 -9671 0
 9668 -9669  9670  1086 -9672 0
 9668 -9669  9670  1086  9673 0

c  1-1 --> 0
c    (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0 ∧ -p_1086) -> (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧ -b^{6, 182}_0)
c  in CNF:
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_2
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_1
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_0
c  in DIMACS:
 9668  9669 -9670  1086 -9671 0
 9668  9669 -9670  1086 -9672 0
 9668  9669 -9670  1086 -9673 0

c  0-1 --> -1
c    (-b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧ -p_1086) -> ( b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0)
c  in CNF:
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨  b^{6, 182}_2
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_1
c     b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨  b^{6, 182}_0
c  in DIMACS:
 9668  9669  9670  1086  9671 0
 9668  9669  9670  1086 -9672 0
 9668  9669  9670  1086  9673 0

c  -1-1 --> -2
c    ( b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧  b^{6, 181}_0 ∧ -p_1086) -> ( b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0)
c  in CNF:
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨  b^{6, 182}_2
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨  b^{6, 182}_1
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨  p_1086 ∨ -b^{6, 182}_0
c  in DIMACS:
-9668  9669 -9670  1086  9671 0
-9668  9669 -9670  1086  9672 0
-9668  9669 -9670  1086 -9673 0

c  -2-1 --> break 
c    ( b^{6, 181}_2 ∧  b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨  b^{6, 181}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-9668 -9669  9670  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 181}_2 ∧ -b^{6, 181}_1 ∧ -b^{6, 181}_0 ∧ true) 
c  in CNF:
c    -b^{6, 181}_2 ∨  b^{6, 181}_1 ∨  b^{6, 181}_0 ∨ false 
c  in DIMACS:
-9668  9669  9670  0

c  3 does not represent an automaton state.
c    -(-b^{6, 181}_2 ∧  b^{6, 181}_1 ∧  b^{6, 181}_0 ∧ true) 
c  in CNF:
c     b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ false 
c  in DIMACS:
 9668 -9669 -9670  0
c  -3 does not represent an automaton state.
c    -( b^{6, 181}_2 ∧  b^{6, 181}_1 ∧  b^{6, 181}_0 ∧ true) 
c  in CNF:
c    -b^{6, 181}_2 ∨ -b^{6, 181}_1 ∨ -b^{6, 181}_0 ∨ false 
c  in DIMACS:
-9668 -9669 -9670  0

c i = 182
c  -2+1 --> -1
c    ( b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧  p_1092) -> ( b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0)
c  in CNF:
c    -b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨  b^{6, 183}_2
c    -b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_1
c    -b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨  b^{6, 183}_0
c  in DIMACS:
-9671 -9672  9673 -1092  9674 0
-9671 -9672  9673 -1092 -9675 0
-9671 -9672  9673 -1092  9676 0

c  -1+1 --> 0
c    ( b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0 ∧  p_1092) -> (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧ -b^{6, 183}_0)
c  in CNF:
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_2
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_1
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_0
c  in DIMACS:
-9671  9672 -9673 -1092 -9674 0
-9671  9672 -9673 -1092 -9675 0
-9671  9672 -9673 -1092 -9676 0

c  0+1 --> 1
c    (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧  p_1092) -> (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0)
c  in CNF:
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_2
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_1
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨  b^{6, 183}_0
c  in DIMACS:
 9671  9672  9673 -1092 -9674 0
 9671  9672  9673 -1092 -9675 0
 9671  9672  9673 -1092  9676 0

c  1+1 --> 2
c    (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0 ∧  p_1092) -> (-b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0)
c  in CNF:
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_2
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨  b^{6, 183}_1
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ -p_1092 ∨ -b^{6, 183}_0
c  in DIMACS:
 9671  9672 -9673 -1092 -9674 0
 9671  9672 -9673 -1092  9675 0
 9671  9672 -9673 -1092 -9676 0

c  2+1 --> break 
c    (-b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 9671 -9672  9673 -1092 1162 0


c  2-1 --> 1
c    (-b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧ -p_1092) -> (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0)
c  in CNF:
c     b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_2
c     b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_1
c     b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨  b^{6, 183}_0
c  in DIMACS:
 9671 -9672  9673  1092 -9674 0
 9671 -9672  9673  1092 -9675 0
 9671 -9672  9673  1092  9676 0

c  1-1 --> 0
c    (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0 ∧ -p_1092) -> (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧ -b^{6, 183}_0)
c  in CNF:
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_2
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_1
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_0
c  in DIMACS:
 9671  9672 -9673  1092 -9674 0
 9671  9672 -9673  1092 -9675 0
 9671  9672 -9673  1092 -9676 0

c  0-1 --> -1
c    (-b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧ -p_1092) -> ( b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0)
c  in CNF:
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨  b^{6, 183}_2
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_1
c     b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨  b^{6, 183}_0
c  in DIMACS:
 9671  9672  9673  1092  9674 0
 9671  9672  9673  1092 -9675 0
 9671  9672  9673  1092  9676 0

c  -1-1 --> -2
c    ( b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧  b^{6, 182}_0 ∧ -p_1092) -> ( b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0)
c  in CNF:
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨  b^{6, 183}_2
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨  b^{6, 183}_1
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨  p_1092 ∨ -b^{6, 183}_0
c  in DIMACS:
-9671  9672 -9673  1092  9674 0
-9671  9672 -9673  1092  9675 0
-9671  9672 -9673  1092 -9676 0

c  -2-1 --> break 
c    ( b^{6, 182}_2 ∧  b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨  b^{6, 182}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-9671 -9672  9673  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 182}_2 ∧ -b^{6, 182}_1 ∧ -b^{6, 182}_0 ∧ true) 
c  in CNF:
c    -b^{6, 182}_2 ∨  b^{6, 182}_1 ∨  b^{6, 182}_0 ∨ false 
c  in DIMACS:
-9671  9672  9673  0

c  3 does not represent an automaton state.
c    -(-b^{6, 182}_2 ∧  b^{6, 182}_1 ∧  b^{6, 182}_0 ∧ true) 
c  in CNF:
c     b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ false 
c  in DIMACS:
 9671 -9672 -9673  0
c  -3 does not represent an automaton state.
c    -( b^{6, 182}_2 ∧  b^{6, 182}_1 ∧  b^{6, 182}_0 ∧ true) 
c  in CNF:
c    -b^{6, 182}_2 ∨ -b^{6, 182}_1 ∨ -b^{6, 182}_0 ∨ false 
c  in DIMACS:
-9671 -9672 -9673  0

c i = 183
c  -2+1 --> -1
c    ( b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧  p_1098) -> ( b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0)
c  in CNF:
c    -b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨  b^{6, 184}_2
c    -b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_1
c    -b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨  b^{6, 184}_0
c  in DIMACS:
-9674 -9675  9676 -1098  9677 0
-9674 -9675  9676 -1098 -9678 0
-9674 -9675  9676 -1098  9679 0

c  -1+1 --> 0
c    ( b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0 ∧  p_1098) -> (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧ -b^{6, 184}_0)
c  in CNF:
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_2
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_1
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_0
c  in DIMACS:
-9674  9675 -9676 -1098 -9677 0
-9674  9675 -9676 -1098 -9678 0
-9674  9675 -9676 -1098 -9679 0

c  0+1 --> 1
c    (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧  p_1098) -> (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0)
c  in CNF:
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_2
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_1
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨  b^{6, 184}_0
c  in DIMACS:
 9674  9675  9676 -1098 -9677 0
 9674  9675  9676 -1098 -9678 0
 9674  9675  9676 -1098  9679 0

c  1+1 --> 2
c    (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0 ∧  p_1098) -> (-b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0)
c  in CNF:
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_2
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨  b^{6, 184}_1
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ -p_1098 ∨ -b^{6, 184}_0
c  in DIMACS:
 9674  9675 -9676 -1098 -9677 0
 9674  9675 -9676 -1098  9678 0
 9674  9675 -9676 -1098 -9679 0

c  2+1 --> break 
c    (-b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 9674 -9675  9676 -1098 1162 0


c  2-1 --> 1
c    (-b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧ -p_1098) -> (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0)
c  in CNF:
c     b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_2
c     b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_1
c     b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨  b^{6, 184}_0
c  in DIMACS:
 9674 -9675  9676  1098 -9677 0
 9674 -9675  9676  1098 -9678 0
 9674 -9675  9676  1098  9679 0

c  1-1 --> 0
c    (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0 ∧ -p_1098) -> (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧ -b^{6, 184}_0)
c  in CNF:
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_2
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_1
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_0
c  in DIMACS:
 9674  9675 -9676  1098 -9677 0
 9674  9675 -9676  1098 -9678 0
 9674  9675 -9676  1098 -9679 0

c  0-1 --> -1
c    (-b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧ -p_1098) -> ( b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0)
c  in CNF:
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨  b^{6, 184}_2
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_1
c     b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨  b^{6, 184}_0
c  in DIMACS:
 9674  9675  9676  1098  9677 0
 9674  9675  9676  1098 -9678 0
 9674  9675  9676  1098  9679 0

c  -1-1 --> -2
c    ( b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧  b^{6, 183}_0 ∧ -p_1098) -> ( b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0)
c  in CNF:
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨  b^{6, 184}_2
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨  b^{6, 184}_1
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨  p_1098 ∨ -b^{6, 184}_0
c  in DIMACS:
-9674  9675 -9676  1098  9677 0
-9674  9675 -9676  1098  9678 0
-9674  9675 -9676  1098 -9679 0

c  -2-1 --> break 
c    ( b^{6, 183}_2 ∧  b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨  b^{6, 183}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-9674 -9675  9676  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 183}_2 ∧ -b^{6, 183}_1 ∧ -b^{6, 183}_0 ∧ true) 
c  in CNF:
c    -b^{6, 183}_2 ∨  b^{6, 183}_1 ∨  b^{6, 183}_0 ∨ false 
c  in DIMACS:
-9674  9675  9676  0

c  3 does not represent an automaton state.
c    -(-b^{6, 183}_2 ∧  b^{6, 183}_1 ∧  b^{6, 183}_0 ∧ true) 
c  in CNF:
c     b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ false 
c  in DIMACS:
 9674 -9675 -9676  0
c  -3 does not represent an automaton state.
c    -( b^{6, 183}_2 ∧  b^{6, 183}_1 ∧  b^{6, 183}_0 ∧ true) 
c  in CNF:
c    -b^{6, 183}_2 ∨ -b^{6, 183}_1 ∨ -b^{6, 183}_0 ∨ false 
c  in DIMACS:
-9674 -9675 -9676  0

c i = 184
c  -2+1 --> -1
c    ( b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧  p_1104) -> ( b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0)
c  in CNF:
c    -b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨  b^{6, 185}_2
c    -b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_1
c    -b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨  b^{6, 185}_0
c  in DIMACS:
-9677 -9678  9679 -1104  9680 0
-9677 -9678  9679 -1104 -9681 0
-9677 -9678  9679 -1104  9682 0

c  -1+1 --> 0
c    ( b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0 ∧  p_1104) -> (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧ -b^{6, 185}_0)
c  in CNF:
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_2
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_1
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_0
c  in DIMACS:
-9677  9678 -9679 -1104 -9680 0
-9677  9678 -9679 -1104 -9681 0
-9677  9678 -9679 -1104 -9682 0

c  0+1 --> 1
c    (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧  p_1104) -> (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0)
c  in CNF:
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_2
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_1
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨  b^{6, 185}_0
c  in DIMACS:
 9677  9678  9679 -1104 -9680 0
 9677  9678  9679 -1104 -9681 0
 9677  9678  9679 -1104  9682 0

c  1+1 --> 2
c    (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0 ∧  p_1104) -> (-b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0)
c  in CNF:
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_2
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨  b^{6, 185}_1
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ -p_1104 ∨ -b^{6, 185}_0
c  in DIMACS:
 9677  9678 -9679 -1104 -9680 0
 9677  9678 -9679 -1104  9681 0
 9677  9678 -9679 -1104 -9682 0

c  2+1 --> break 
c    (-b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 9677 -9678  9679 -1104 1162 0


c  2-1 --> 1
c    (-b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧ -p_1104) -> (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0)
c  in CNF:
c     b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_2
c     b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_1
c     b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨  b^{6, 185}_0
c  in DIMACS:
 9677 -9678  9679  1104 -9680 0
 9677 -9678  9679  1104 -9681 0
 9677 -9678  9679  1104  9682 0

c  1-1 --> 0
c    (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0 ∧ -p_1104) -> (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧ -b^{6, 185}_0)
c  in CNF:
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_2
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_1
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_0
c  in DIMACS:
 9677  9678 -9679  1104 -9680 0
 9677  9678 -9679  1104 -9681 0
 9677  9678 -9679  1104 -9682 0

c  0-1 --> -1
c    (-b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧ -p_1104) -> ( b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0)
c  in CNF:
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨  b^{6, 185}_2
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_1
c     b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨  b^{6, 185}_0
c  in DIMACS:
 9677  9678  9679  1104  9680 0
 9677  9678  9679  1104 -9681 0
 9677  9678  9679  1104  9682 0

c  -1-1 --> -2
c    ( b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧  b^{6, 184}_0 ∧ -p_1104) -> ( b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0)
c  in CNF:
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨  b^{6, 185}_2
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨  b^{6, 185}_1
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨  p_1104 ∨ -b^{6, 185}_0
c  in DIMACS:
-9677  9678 -9679  1104  9680 0
-9677  9678 -9679  1104  9681 0
-9677  9678 -9679  1104 -9682 0

c  -2-1 --> break 
c    ( b^{6, 184}_2 ∧  b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨  b^{6, 184}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-9677 -9678  9679  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 184}_2 ∧ -b^{6, 184}_1 ∧ -b^{6, 184}_0 ∧ true) 
c  in CNF:
c    -b^{6, 184}_2 ∨  b^{6, 184}_1 ∨  b^{6, 184}_0 ∨ false 
c  in DIMACS:
-9677  9678  9679  0

c  3 does not represent an automaton state.
c    -(-b^{6, 184}_2 ∧  b^{6, 184}_1 ∧  b^{6, 184}_0 ∧ true) 
c  in CNF:
c     b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ false 
c  in DIMACS:
 9677 -9678 -9679  0
c  -3 does not represent an automaton state.
c    -( b^{6, 184}_2 ∧  b^{6, 184}_1 ∧  b^{6, 184}_0 ∧ true) 
c  in CNF:
c    -b^{6, 184}_2 ∨ -b^{6, 184}_1 ∨ -b^{6, 184}_0 ∨ false 
c  in DIMACS:
-9677 -9678 -9679  0

c i = 185
c  -2+1 --> -1
c    ( b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧  p_1110) -> ( b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0)
c  in CNF:
c    -b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨  b^{6, 186}_2
c    -b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_1
c    -b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨  b^{6, 186}_0
c  in DIMACS:
-9680 -9681  9682 -1110  9683 0
-9680 -9681  9682 -1110 -9684 0
-9680 -9681  9682 -1110  9685 0

c  -1+1 --> 0
c    ( b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0 ∧  p_1110) -> (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧ -b^{6, 186}_0)
c  in CNF:
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_2
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_1
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_0
c  in DIMACS:
-9680  9681 -9682 -1110 -9683 0
-9680  9681 -9682 -1110 -9684 0
-9680  9681 -9682 -1110 -9685 0

c  0+1 --> 1
c    (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧  p_1110) -> (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0)
c  in CNF:
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_2
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_1
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨  b^{6, 186}_0
c  in DIMACS:
 9680  9681  9682 -1110 -9683 0
 9680  9681  9682 -1110 -9684 0
 9680  9681  9682 -1110  9685 0

c  1+1 --> 2
c    (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0 ∧  p_1110) -> (-b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0)
c  in CNF:
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_2
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨  b^{6, 186}_1
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ -p_1110 ∨ -b^{6, 186}_0
c  in DIMACS:
 9680  9681 -9682 -1110 -9683 0
 9680  9681 -9682 -1110  9684 0
 9680  9681 -9682 -1110 -9685 0

c  2+1 --> break 
c    (-b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 9680 -9681  9682 -1110 1162 0


c  2-1 --> 1
c    (-b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧ -p_1110) -> (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0)
c  in CNF:
c     b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_2
c     b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_1
c     b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨  b^{6, 186}_0
c  in DIMACS:
 9680 -9681  9682  1110 -9683 0
 9680 -9681  9682  1110 -9684 0
 9680 -9681  9682  1110  9685 0

c  1-1 --> 0
c    (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0 ∧ -p_1110) -> (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧ -b^{6, 186}_0)
c  in CNF:
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_2
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_1
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_0
c  in DIMACS:
 9680  9681 -9682  1110 -9683 0
 9680  9681 -9682  1110 -9684 0
 9680  9681 -9682  1110 -9685 0

c  0-1 --> -1
c    (-b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧ -p_1110) -> ( b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0)
c  in CNF:
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨  b^{6, 186}_2
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_1
c     b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨  b^{6, 186}_0
c  in DIMACS:
 9680  9681  9682  1110  9683 0
 9680  9681  9682  1110 -9684 0
 9680  9681  9682  1110  9685 0

c  -1-1 --> -2
c    ( b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧  b^{6, 185}_0 ∧ -p_1110) -> ( b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0)
c  in CNF:
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨  b^{6, 186}_2
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨  b^{6, 186}_1
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨  p_1110 ∨ -b^{6, 186}_0
c  in DIMACS:
-9680  9681 -9682  1110  9683 0
-9680  9681 -9682  1110  9684 0
-9680  9681 -9682  1110 -9685 0

c  -2-1 --> break 
c    ( b^{6, 185}_2 ∧  b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨  b^{6, 185}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-9680 -9681  9682  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 185}_2 ∧ -b^{6, 185}_1 ∧ -b^{6, 185}_0 ∧ true) 
c  in CNF:
c    -b^{6, 185}_2 ∨  b^{6, 185}_1 ∨  b^{6, 185}_0 ∨ false 
c  in DIMACS:
-9680  9681  9682  0

c  3 does not represent an automaton state.
c    -(-b^{6, 185}_2 ∧  b^{6, 185}_1 ∧  b^{6, 185}_0 ∧ true) 
c  in CNF:
c     b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ false 
c  in DIMACS:
 9680 -9681 -9682  0
c  -3 does not represent an automaton state.
c    -( b^{6, 185}_2 ∧  b^{6, 185}_1 ∧  b^{6, 185}_0 ∧ true) 
c  in CNF:
c    -b^{6, 185}_2 ∨ -b^{6, 185}_1 ∨ -b^{6, 185}_0 ∨ false 
c  in DIMACS:
-9680 -9681 -9682  0

c i = 186
c  -2+1 --> -1
c    ( b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧  p_1116) -> ( b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0)
c  in CNF:
c    -b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨  b^{6, 187}_2
c    -b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_1
c    -b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨  b^{6, 187}_0
c  in DIMACS:
-9683 -9684  9685 -1116  9686 0
-9683 -9684  9685 -1116 -9687 0
-9683 -9684  9685 -1116  9688 0

c  -1+1 --> 0
c    ( b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0 ∧  p_1116) -> (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧ -b^{6, 187}_0)
c  in CNF:
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_2
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_1
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_0
c  in DIMACS:
-9683  9684 -9685 -1116 -9686 0
-9683  9684 -9685 -1116 -9687 0
-9683  9684 -9685 -1116 -9688 0

c  0+1 --> 1
c    (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧  p_1116) -> (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0)
c  in CNF:
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_2
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_1
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨  b^{6, 187}_0
c  in DIMACS:
 9683  9684  9685 -1116 -9686 0
 9683  9684  9685 -1116 -9687 0
 9683  9684  9685 -1116  9688 0

c  1+1 --> 2
c    (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0 ∧  p_1116) -> (-b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0)
c  in CNF:
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_2
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨  b^{6, 187}_1
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ -p_1116 ∨ -b^{6, 187}_0
c  in DIMACS:
 9683  9684 -9685 -1116 -9686 0
 9683  9684 -9685 -1116  9687 0
 9683  9684 -9685 -1116 -9688 0

c  2+1 --> break 
c    (-b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 9683 -9684  9685 -1116 1162 0


c  2-1 --> 1
c    (-b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧ -p_1116) -> (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0)
c  in CNF:
c     b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_2
c     b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_1
c     b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨  b^{6, 187}_0
c  in DIMACS:
 9683 -9684  9685  1116 -9686 0
 9683 -9684  9685  1116 -9687 0
 9683 -9684  9685  1116  9688 0

c  1-1 --> 0
c    (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0 ∧ -p_1116) -> (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧ -b^{6, 187}_0)
c  in CNF:
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_2
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_1
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_0
c  in DIMACS:
 9683  9684 -9685  1116 -9686 0
 9683  9684 -9685  1116 -9687 0
 9683  9684 -9685  1116 -9688 0

c  0-1 --> -1
c    (-b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧ -p_1116) -> ( b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0)
c  in CNF:
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨  b^{6, 187}_2
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_1
c     b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨  b^{6, 187}_0
c  in DIMACS:
 9683  9684  9685  1116  9686 0
 9683  9684  9685  1116 -9687 0
 9683  9684  9685  1116  9688 0

c  -1-1 --> -2
c    ( b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧  b^{6, 186}_0 ∧ -p_1116) -> ( b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0)
c  in CNF:
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨  b^{6, 187}_2
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨  b^{6, 187}_1
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨  p_1116 ∨ -b^{6, 187}_0
c  in DIMACS:
-9683  9684 -9685  1116  9686 0
-9683  9684 -9685  1116  9687 0
-9683  9684 -9685  1116 -9688 0

c  -2-1 --> break 
c    ( b^{6, 186}_2 ∧  b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨  b^{6, 186}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-9683 -9684  9685  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 186}_2 ∧ -b^{6, 186}_1 ∧ -b^{6, 186}_0 ∧ true) 
c  in CNF:
c    -b^{6, 186}_2 ∨  b^{6, 186}_1 ∨  b^{6, 186}_0 ∨ false 
c  in DIMACS:
-9683  9684  9685  0

c  3 does not represent an automaton state.
c    -(-b^{6, 186}_2 ∧  b^{6, 186}_1 ∧  b^{6, 186}_0 ∧ true) 
c  in CNF:
c     b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ false 
c  in DIMACS:
 9683 -9684 -9685  0
c  -3 does not represent an automaton state.
c    -( b^{6, 186}_2 ∧  b^{6, 186}_1 ∧  b^{6, 186}_0 ∧ true) 
c  in CNF:
c    -b^{6, 186}_2 ∨ -b^{6, 186}_1 ∨ -b^{6, 186}_0 ∨ false 
c  in DIMACS:
-9683 -9684 -9685  0

c i = 187
c  -2+1 --> -1
c    ( b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧  p_1122) -> ( b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0)
c  in CNF:
c    -b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨  b^{6, 188}_2
c    -b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_1
c    -b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨  b^{6, 188}_0
c  in DIMACS:
-9686 -9687  9688 -1122  9689 0
-9686 -9687  9688 -1122 -9690 0
-9686 -9687  9688 -1122  9691 0

c  -1+1 --> 0
c    ( b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0 ∧  p_1122) -> (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧ -b^{6, 188}_0)
c  in CNF:
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_2
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_1
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_0
c  in DIMACS:
-9686  9687 -9688 -1122 -9689 0
-9686  9687 -9688 -1122 -9690 0
-9686  9687 -9688 -1122 -9691 0

c  0+1 --> 1
c    (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧  p_1122) -> (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0)
c  in CNF:
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_2
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_1
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨  b^{6, 188}_0
c  in DIMACS:
 9686  9687  9688 -1122 -9689 0
 9686  9687  9688 -1122 -9690 0
 9686  9687  9688 -1122  9691 0

c  1+1 --> 2
c    (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0 ∧  p_1122) -> (-b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0)
c  in CNF:
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_2
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨  b^{6, 188}_1
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ -p_1122 ∨ -b^{6, 188}_0
c  in DIMACS:
 9686  9687 -9688 -1122 -9689 0
 9686  9687 -9688 -1122  9690 0
 9686  9687 -9688 -1122 -9691 0

c  2+1 --> break 
c    (-b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 9686 -9687  9688 -1122 1162 0


c  2-1 --> 1
c    (-b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧ -p_1122) -> (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0)
c  in CNF:
c     b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_2
c     b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_1
c     b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨  b^{6, 188}_0
c  in DIMACS:
 9686 -9687  9688  1122 -9689 0
 9686 -9687  9688  1122 -9690 0
 9686 -9687  9688  1122  9691 0

c  1-1 --> 0
c    (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0 ∧ -p_1122) -> (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧ -b^{6, 188}_0)
c  in CNF:
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_2
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_1
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_0
c  in DIMACS:
 9686  9687 -9688  1122 -9689 0
 9686  9687 -9688  1122 -9690 0
 9686  9687 -9688  1122 -9691 0

c  0-1 --> -1
c    (-b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧ -p_1122) -> ( b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0)
c  in CNF:
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨  b^{6, 188}_2
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_1
c     b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨  b^{6, 188}_0
c  in DIMACS:
 9686  9687  9688  1122  9689 0
 9686  9687  9688  1122 -9690 0
 9686  9687  9688  1122  9691 0

c  -1-1 --> -2
c    ( b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧  b^{6, 187}_0 ∧ -p_1122) -> ( b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0)
c  in CNF:
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨  b^{6, 188}_2
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨  b^{6, 188}_1
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨  p_1122 ∨ -b^{6, 188}_0
c  in DIMACS:
-9686  9687 -9688  1122  9689 0
-9686  9687 -9688  1122  9690 0
-9686  9687 -9688  1122 -9691 0

c  -2-1 --> break 
c    ( b^{6, 187}_2 ∧  b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨  b^{6, 187}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-9686 -9687  9688  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 187}_2 ∧ -b^{6, 187}_1 ∧ -b^{6, 187}_0 ∧ true) 
c  in CNF:
c    -b^{6, 187}_2 ∨  b^{6, 187}_1 ∨  b^{6, 187}_0 ∨ false 
c  in DIMACS:
-9686  9687  9688  0

c  3 does not represent an automaton state.
c    -(-b^{6, 187}_2 ∧  b^{6, 187}_1 ∧  b^{6, 187}_0 ∧ true) 
c  in CNF:
c     b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ false 
c  in DIMACS:
 9686 -9687 -9688  0
c  -3 does not represent an automaton state.
c    -( b^{6, 187}_2 ∧  b^{6, 187}_1 ∧  b^{6, 187}_0 ∧ true) 
c  in CNF:
c    -b^{6, 187}_2 ∨ -b^{6, 187}_1 ∨ -b^{6, 187}_0 ∨ false 
c  in DIMACS:
-9686 -9687 -9688  0

c i = 188
c  -2+1 --> -1
c    ( b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧  p_1128) -> ( b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0)
c  in CNF:
c    -b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨  b^{6, 189}_2
c    -b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_1
c    -b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨  b^{6, 189}_0
c  in DIMACS:
-9689 -9690  9691 -1128  9692 0
-9689 -9690  9691 -1128 -9693 0
-9689 -9690  9691 -1128  9694 0

c  -1+1 --> 0
c    ( b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0 ∧  p_1128) -> (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧ -b^{6, 189}_0)
c  in CNF:
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_2
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_1
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_0
c  in DIMACS:
-9689  9690 -9691 -1128 -9692 0
-9689  9690 -9691 -1128 -9693 0
-9689  9690 -9691 -1128 -9694 0

c  0+1 --> 1
c    (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧  p_1128) -> (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0)
c  in CNF:
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_2
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_1
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨  b^{6, 189}_0
c  in DIMACS:
 9689  9690  9691 -1128 -9692 0
 9689  9690  9691 -1128 -9693 0
 9689  9690  9691 -1128  9694 0

c  1+1 --> 2
c    (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0 ∧  p_1128) -> (-b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0)
c  in CNF:
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_2
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨  b^{6, 189}_1
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ -p_1128 ∨ -b^{6, 189}_0
c  in DIMACS:
 9689  9690 -9691 -1128 -9692 0
 9689  9690 -9691 -1128  9693 0
 9689  9690 -9691 -1128 -9694 0

c  2+1 --> break 
c    (-b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 9689 -9690  9691 -1128 1162 0


c  2-1 --> 1
c    (-b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧ -p_1128) -> (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0)
c  in CNF:
c     b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_2
c     b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_1
c     b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨  b^{6, 189}_0
c  in DIMACS:
 9689 -9690  9691  1128 -9692 0
 9689 -9690  9691  1128 -9693 0
 9689 -9690  9691  1128  9694 0

c  1-1 --> 0
c    (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0 ∧ -p_1128) -> (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧ -b^{6, 189}_0)
c  in CNF:
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_2
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_1
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_0
c  in DIMACS:
 9689  9690 -9691  1128 -9692 0
 9689  9690 -9691  1128 -9693 0
 9689  9690 -9691  1128 -9694 0

c  0-1 --> -1
c    (-b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧ -p_1128) -> ( b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0)
c  in CNF:
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨  b^{6, 189}_2
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_1
c     b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨  b^{6, 189}_0
c  in DIMACS:
 9689  9690  9691  1128  9692 0
 9689  9690  9691  1128 -9693 0
 9689  9690  9691  1128  9694 0

c  -1-1 --> -2
c    ( b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧  b^{6, 188}_0 ∧ -p_1128) -> ( b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0)
c  in CNF:
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨  b^{6, 189}_2
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨  b^{6, 189}_1
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨  p_1128 ∨ -b^{6, 189}_0
c  in DIMACS:
-9689  9690 -9691  1128  9692 0
-9689  9690 -9691  1128  9693 0
-9689  9690 -9691  1128 -9694 0

c  -2-1 --> break 
c    ( b^{6, 188}_2 ∧  b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨  b^{6, 188}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-9689 -9690  9691  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 188}_2 ∧ -b^{6, 188}_1 ∧ -b^{6, 188}_0 ∧ true) 
c  in CNF:
c    -b^{6, 188}_2 ∨  b^{6, 188}_1 ∨  b^{6, 188}_0 ∨ false 
c  in DIMACS:
-9689  9690  9691  0

c  3 does not represent an automaton state.
c    -(-b^{6, 188}_2 ∧  b^{6, 188}_1 ∧  b^{6, 188}_0 ∧ true) 
c  in CNF:
c     b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ false 
c  in DIMACS:
 9689 -9690 -9691  0
c  -3 does not represent an automaton state.
c    -( b^{6, 188}_2 ∧  b^{6, 188}_1 ∧  b^{6, 188}_0 ∧ true) 
c  in CNF:
c    -b^{6, 188}_2 ∨ -b^{6, 188}_1 ∨ -b^{6, 188}_0 ∨ false 
c  in DIMACS:
-9689 -9690 -9691  0

c i = 189
c  -2+1 --> -1
c    ( b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧  p_1134) -> ( b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0)
c  in CNF:
c    -b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨  b^{6, 190}_2
c    -b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_1
c    -b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨  b^{6, 190}_0
c  in DIMACS:
-9692 -9693  9694 -1134  9695 0
-9692 -9693  9694 -1134 -9696 0
-9692 -9693  9694 -1134  9697 0

c  -1+1 --> 0
c    ( b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0 ∧  p_1134) -> (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧ -b^{6, 190}_0)
c  in CNF:
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_2
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_1
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_0
c  in DIMACS:
-9692  9693 -9694 -1134 -9695 0
-9692  9693 -9694 -1134 -9696 0
-9692  9693 -9694 -1134 -9697 0

c  0+1 --> 1
c    (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧  p_1134) -> (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0)
c  in CNF:
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_2
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_1
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨  b^{6, 190}_0
c  in DIMACS:
 9692  9693  9694 -1134 -9695 0
 9692  9693  9694 -1134 -9696 0
 9692  9693  9694 -1134  9697 0

c  1+1 --> 2
c    (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0 ∧  p_1134) -> (-b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0)
c  in CNF:
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_2
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨  b^{6, 190}_1
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ -p_1134 ∨ -b^{6, 190}_0
c  in DIMACS:
 9692  9693 -9694 -1134 -9695 0
 9692  9693 -9694 -1134  9696 0
 9692  9693 -9694 -1134 -9697 0

c  2+1 --> break 
c    (-b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 9692 -9693  9694 -1134 1162 0


c  2-1 --> 1
c    (-b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧ -p_1134) -> (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0)
c  in CNF:
c     b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_2
c     b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_1
c     b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨  b^{6, 190}_0
c  in DIMACS:
 9692 -9693  9694  1134 -9695 0
 9692 -9693  9694  1134 -9696 0
 9692 -9693  9694  1134  9697 0

c  1-1 --> 0
c    (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0 ∧ -p_1134) -> (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧ -b^{6, 190}_0)
c  in CNF:
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_2
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_1
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_0
c  in DIMACS:
 9692  9693 -9694  1134 -9695 0
 9692  9693 -9694  1134 -9696 0
 9692  9693 -9694  1134 -9697 0

c  0-1 --> -1
c    (-b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧ -p_1134) -> ( b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0)
c  in CNF:
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨  b^{6, 190}_2
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_1
c     b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨  b^{6, 190}_0
c  in DIMACS:
 9692  9693  9694  1134  9695 0
 9692  9693  9694  1134 -9696 0
 9692  9693  9694  1134  9697 0

c  -1-1 --> -2
c    ( b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧  b^{6, 189}_0 ∧ -p_1134) -> ( b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0)
c  in CNF:
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨  b^{6, 190}_2
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨  b^{6, 190}_1
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨  p_1134 ∨ -b^{6, 190}_0
c  in DIMACS:
-9692  9693 -9694  1134  9695 0
-9692  9693 -9694  1134  9696 0
-9692  9693 -9694  1134 -9697 0

c  -2-1 --> break 
c    ( b^{6, 189}_2 ∧  b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨  b^{6, 189}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-9692 -9693  9694  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 189}_2 ∧ -b^{6, 189}_1 ∧ -b^{6, 189}_0 ∧ true) 
c  in CNF:
c    -b^{6, 189}_2 ∨  b^{6, 189}_1 ∨  b^{6, 189}_0 ∨ false 
c  in DIMACS:
-9692  9693  9694  0

c  3 does not represent an automaton state.
c    -(-b^{6, 189}_2 ∧  b^{6, 189}_1 ∧  b^{6, 189}_0 ∧ true) 
c  in CNF:
c     b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ false 
c  in DIMACS:
 9692 -9693 -9694  0
c  -3 does not represent an automaton state.
c    -( b^{6, 189}_2 ∧  b^{6, 189}_1 ∧  b^{6, 189}_0 ∧ true) 
c  in CNF:
c    -b^{6, 189}_2 ∨ -b^{6, 189}_1 ∨ -b^{6, 189}_0 ∨ false 
c  in DIMACS:
-9692 -9693 -9694  0

c i = 190
c  -2+1 --> -1
c    ( b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧  p_1140) -> ( b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0)
c  in CNF:
c    -b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨  b^{6, 191}_2
c    -b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_1
c    -b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨  b^{6, 191}_0
c  in DIMACS:
-9695 -9696  9697 -1140  9698 0
-9695 -9696  9697 -1140 -9699 0
-9695 -9696  9697 -1140  9700 0

c  -1+1 --> 0
c    ( b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0 ∧  p_1140) -> (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧ -b^{6, 191}_0)
c  in CNF:
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_2
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_1
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_0
c  in DIMACS:
-9695  9696 -9697 -1140 -9698 0
-9695  9696 -9697 -1140 -9699 0
-9695  9696 -9697 -1140 -9700 0

c  0+1 --> 1
c    (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧  p_1140) -> (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0)
c  in CNF:
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_2
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_1
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨  b^{6, 191}_0
c  in DIMACS:
 9695  9696  9697 -1140 -9698 0
 9695  9696  9697 -1140 -9699 0
 9695  9696  9697 -1140  9700 0

c  1+1 --> 2
c    (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0 ∧  p_1140) -> (-b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0)
c  in CNF:
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_2
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨  b^{6, 191}_1
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ -p_1140 ∨ -b^{6, 191}_0
c  in DIMACS:
 9695  9696 -9697 -1140 -9698 0
 9695  9696 -9697 -1140  9699 0
 9695  9696 -9697 -1140 -9700 0

c  2+1 --> break 
c    (-b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 9695 -9696  9697 -1140 1162 0


c  2-1 --> 1
c    (-b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧ -p_1140) -> (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0)
c  in CNF:
c     b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_2
c     b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_1
c     b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨  b^{6, 191}_0
c  in DIMACS:
 9695 -9696  9697  1140 -9698 0
 9695 -9696  9697  1140 -9699 0
 9695 -9696  9697  1140  9700 0

c  1-1 --> 0
c    (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0 ∧ -p_1140) -> (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧ -b^{6, 191}_0)
c  in CNF:
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_2
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_1
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_0
c  in DIMACS:
 9695  9696 -9697  1140 -9698 0
 9695  9696 -9697  1140 -9699 0
 9695  9696 -9697  1140 -9700 0

c  0-1 --> -1
c    (-b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧ -p_1140) -> ( b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0)
c  in CNF:
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨  b^{6, 191}_2
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_1
c     b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨  b^{6, 191}_0
c  in DIMACS:
 9695  9696  9697  1140  9698 0
 9695  9696  9697  1140 -9699 0
 9695  9696  9697  1140  9700 0

c  -1-1 --> -2
c    ( b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧  b^{6, 190}_0 ∧ -p_1140) -> ( b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0)
c  in CNF:
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨  b^{6, 191}_2
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨  b^{6, 191}_1
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨  p_1140 ∨ -b^{6, 191}_0
c  in DIMACS:
-9695  9696 -9697  1140  9698 0
-9695  9696 -9697  1140  9699 0
-9695  9696 -9697  1140 -9700 0

c  -2-1 --> break 
c    ( b^{6, 190}_2 ∧  b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨  b^{6, 190}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-9695 -9696  9697  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 190}_2 ∧ -b^{6, 190}_1 ∧ -b^{6, 190}_0 ∧ true) 
c  in CNF:
c    -b^{6, 190}_2 ∨  b^{6, 190}_1 ∨  b^{6, 190}_0 ∨ false 
c  in DIMACS:
-9695  9696  9697  0

c  3 does not represent an automaton state.
c    -(-b^{6, 190}_2 ∧  b^{6, 190}_1 ∧  b^{6, 190}_0 ∧ true) 
c  in CNF:
c     b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ false 
c  in DIMACS:
 9695 -9696 -9697  0
c  -3 does not represent an automaton state.
c    -( b^{6, 190}_2 ∧  b^{6, 190}_1 ∧  b^{6, 190}_0 ∧ true) 
c  in CNF:
c    -b^{6, 190}_2 ∨ -b^{6, 190}_1 ∨ -b^{6, 190}_0 ∨ false 
c  in DIMACS:
-9695 -9696 -9697  0

c i = 191
c  -2+1 --> -1
c    ( b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧  p_1146) -> ( b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0)
c  in CNF:
c    -b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨  b^{6, 192}_2
c    -b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_1
c    -b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨  b^{6, 192}_0
c  in DIMACS:
-9698 -9699  9700 -1146  9701 0
-9698 -9699  9700 -1146 -9702 0
-9698 -9699  9700 -1146  9703 0

c  -1+1 --> 0
c    ( b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0 ∧  p_1146) -> (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧ -b^{6, 192}_0)
c  in CNF:
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_2
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_1
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_0
c  in DIMACS:
-9698  9699 -9700 -1146 -9701 0
-9698  9699 -9700 -1146 -9702 0
-9698  9699 -9700 -1146 -9703 0

c  0+1 --> 1
c    (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧  p_1146) -> (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0)
c  in CNF:
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_2
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_1
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨  b^{6, 192}_0
c  in DIMACS:
 9698  9699  9700 -1146 -9701 0
 9698  9699  9700 -1146 -9702 0
 9698  9699  9700 -1146  9703 0

c  1+1 --> 2
c    (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0 ∧  p_1146) -> (-b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0)
c  in CNF:
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_2
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨  b^{6, 192}_1
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ -p_1146 ∨ -b^{6, 192}_0
c  in DIMACS:
 9698  9699 -9700 -1146 -9701 0
 9698  9699 -9700 -1146  9702 0
 9698  9699 -9700 -1146 -9703 0

c  2+1 --> break 
c    (-b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 9698 -9699  9700 -1146 1162 0


c  2-1 --> 1
c    (-b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧ -p_1146) -> (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0)
c  in CNF:
c     b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_2
c     b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_1
c     b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨  b^{6, 192}_0
c  in DIMACS:
 9698 -9699  9700  1146 -9701 0
 9698 -9699  9700  1146 -9702 0
 9698 -9699  9700  1146  9703 0

c  1-1 --> 0
c    (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0 ∧ -p_1146) -> (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧ -b^{6, 192}_0)
c  in CNF:
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_2
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_1
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_0
c  in DIMACS:
 9698  9699 -9700  1146 -9701 0
 9698  9699 -9700  1146 -9702 0
 9698  9699 -9700  1146 -9703 0

c  0-1 --> -1
c    (-b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧ -p_1146) -> ( b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0)
c  in CNF:
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨  b^{6, 192}_2
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_1
c     b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨  b^{6, 192}_0
c  in DIMACS:
 9698  9699  9700  1146  9701 0
 9698  9699  9700  1146 -9702 0
 9698  9699  9700  1146  9703 0

c  -1-1 --> -2
c    ( b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧  b^{6, 191}_0 ∧ -p_1146) -> ( b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0)
c  in CNF:
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨  b^{6, 192}_2
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨  b^{6, 192}_1
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨  p_1146 ∨ -b^{6, 192}_0
c  in DIMACS:
-9698  9699 -9700  1146  9701 0
-9698  9699 -9700  1146  9702 0
-9698  9699 -9700  1146 -9703 0

c  -2-1 --> break 
c    ( b^{6, 191}_2 ∧  b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨  b^{6, 191}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-9698 -9699  9700  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 191}_2 ∧ -b^{6, 191}_1 ∧ -b^{6, 191}_0 ∧ true) 
c  in CNF:
c    -b^{6, 191}_2 ∨  b^{6, 191}_1 ∨  b^{6, 191}_0 ∨ false 
c  in DIMACS:
-9698  9699  9700  0

c  3 does not represent an automaton state.
c    -(-b^{6, 191}_2 ∧  b^{6, 191}_1 ∧  b^{6, 191}_0 ∧ true) 
c  in CNF:
c     b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ false 
c  in DIMACS:
 9698 -9699 -9700  0
c  -3 does not represent an automaton state.
c    -( b^{6, 191}_2 ∧  b^{6, 191}_1 ∧  b^{6, 191}_0 ∧ true) 
c  in CNF:
c    -b^{6, 191}_2 ∨ -b^{6, 191}_1 ∨ -b^{6, 191}_0 ∨ false 
c  in DIMACS:
-9698 -9699 -9700  0

c i = 192
c  -2+1 --> -1
c    ( b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧  p_1152) -> ( b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0)
c  in CNF:
c    -b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨  b^{6, 193}_2
c    -b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_1
c    -b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨  b^{6, 193}_0
c  in DIMACS:
-9701 -9702  9703 -1152  9704 0
-9701 -9702  9703 -1152 -9705 0
-9701 -9702  9703 -1152  9706 0

c  -1+1 --> 0
c    ( b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0 ∧  p_1152) -> (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧ -b^{6, 193}_0)
c  in CNF:
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_2
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_1
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_0
c  in DIMACS:
-9701  9702 -9703 -1152 -9704 0
-9701  9702 -9703 -1152 -9705 0
-9701  9702 -9703 -1152 -9706 0

c  0+1 --> 1
c    (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧  p_1152) -> (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0)
c  in CNF:
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_2
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_1
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨  b^{6, 193}_0
c  in DIMACS:
 9701  9702  9703 -1152 -9704 0
 9701  9702  9703 -1152 -9705 0
 9701  9702  9703 -1152  9706 0

c  1+1 --> 2
c    (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0 ∧  p_1152) -> (-b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0)
c  in CNF:
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_2
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨  b^{6, 193}_1
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ -p_1152 ∨ -b^{6, 193}_0
c  in DIMACS:
 9701  9702 -9703 -1152 -9704 0
 9701  9702 -9703 -1152  9705 0
 9701  9702 -9703 -1152 -9706 0

c  2+1 --> break 
c    (-b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 9701 -9702  9703 -1152 1162 0


c  2-1 --> 1
c    (-b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧ -p_1152) -> (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0)
c  in CNF:
c     b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_2
c     b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_1
c     b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨  b^{6, 193}_0
c  in DIMACS:
 9701 -9702  9703  1152 -9704 0
 9701 -9702  9703  1152 -9705 0
 9701 -9702  9703  1152  9706 0

c  1-1 --> 0
c    (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0 ∧ -p_1152) -> (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧ -b^{6, 193}_0)
c  in CNF:
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_2
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_1
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_0
c  in DIMACS:
 9701  9702 -9703  1152 -9704 0
 9701  9702 -9703  1152 -9705 0
 9701  9702 -9703  1152 -9706 0

c  0-1 --> -1
c    (-b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧ -p_1152) -> ( b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0)
c  in CNF:
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨  b^{6, 193}_2
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_1
c     b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨  b^{6, 193}_0
c  in DIMACS:
 9701  9702  9703  1152  9704 0
 9701  9702  9703  1152 -9705 0
 9701  9702  9703  1152  9706 0

c  -1-1 --> -2
c    ( b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧  b^{6, 192}_0 ∧ -p_1152) -> ( b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0)
c  in CNF:
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨  b^{6, 193}_2
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨  b^{6, 193}_1
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨  p_1152 ∨ -b^{6, 193}_0
c  in DIMACS:
-9701  9702 -9703  1152  9704 0
-9701  9702 -9703  1152  9705 0
-9701  9702 -9703  1152 -9706 0

c  -2-1 --> break 
c    ( b^{6, 192}_2 ∧  b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨  b^{6, 192}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-9701 -9702  9703  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 192}_2 ∧ -b^{6, 192}_1 ∧ -b^{6, 192}_0 ∧ true) 
c  in CNF:
c    -b^{6, 192}_2 ∨  b^{6, 192}_1 ∨  b^{6, 192}_0 ∨ false 
c  in DIMACS:
-9701  9702  9703  0

c  3 does not represent an automaton state.
c    -(-b^{6, 192}_2 ∧  b^{6, 192}_1 ∧  b^{6, 192}_0 ∧ true) 
c  in CNF:
c     b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ false 
c  in DIMACS:
 9701 -9702 -9703  0
c  -3 does not represent an automaton state.
c    -( b^{6, 192}_2 ∧  b^{6, 192}_1 ∧  b^{6, 192}_0 ∧ true) 
c  in CNF:
c    -b^{6, 192}_2 ∨ -b^{6, 192}_1 ∨ -b^{6, 192}_0 ∨ false 
c  in DIMACS:
-9701 -9702 -9703  0

c i = 193
c  -2+1 --> -1
c    ( b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧  p_1158) -> ( b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧  b^{6, 194}_0)
c  in CNF:
c    -b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨  b^{6, 194}_2
c    -b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_1
c    -b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨  b^{6, 194}_0
c  in DIMACS:
-9704 -9705  9706 -1158  9707 0
-9704 -9705  9706 -1158 -9708 0
-9704 -9705  9706 -1158  9709 0

c  -1+1 --> 0
c    ( b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0 ∧  p_1158) -> (-b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧ -b^{6, 194}_0)
c  in CNF:
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_2
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_1
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_0
c  in DIMACS:
-9704  9705 -9706 -1158 -9707 0
-9704  9705 -9706 -1158 -9708 0
-9704  9705 -9706 -1158 -9709 0

c  0+1 --> 1
c    (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧  p_1158) -> (-b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧  b^{6, 194}_0)
c  in CNF:
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_2
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_1
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨  b^{6, 194}_0
c  in DIMACS:
 9704  9705  9706 -1158 -9707 0
 9704  9705  9706 -1158 -9708 0
 9704  9705  9706 -1158  9709 0

c  1+1 --> 2
c    (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0 ∧  p_1158) -> (-b^{6, 194}_2 ∧  b^{6, 194}_1 ∧ -b^{6, 194}_0)
c  in CNF:
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_2
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨  b^{6, 194}_1
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ -p_1158 ∨ -b^{6, 194}_0
c  in DIMACS:
 9704  9705 -9706 -1158 -9707 0
 9704  9705 -9706 -1158  9708 0
 9704  9705 -9706 -1158 -9709 0

c  2+1 --> break 
c    (-b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 9704 -9705  9706 -1158 1162 0


c  2-1 --> 1
c    (-b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧ -p_1158) -> (-b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧  b^{6, 194}_0)
c  in CNF:
c     b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_2
c     b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_1
c     b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨  b^{6, 194}_0
c  in DIMACS:
 9704 -9705  9706  1158 -9707 0
 9704 -9705  9706  1158 -9708 0
 9704 -9705  9706  1158  9709 0

c  1-1 --> 0
c    (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0 ∧ -p_1158) -> (-b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧ -b^{6, 194}_0)
c  in CNF:
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_2
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_1
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_0
c  in DIMACS:
 9704  9705 -9706  1158 -9707 0
 9704  9705 -9706  1158 -9708 0
 9704  9705 -9706  1158 -9709 0

c  0-1 --> -1
c    (-b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧ -p_1158) -> ( b^{6, 194}_2 ∧ -b^{6, 194}_1 ∧  b^{6, 194}_0)
c  in CNF:
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨  b^{6, 194}_2
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_1
c     b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨  b^{6, 194}_0
c  in DIMACS:
 9704  9705  9706  1158  9707 0
 9704  9705  9706  1158 -9708 0
 9704  9705  9706  1158  9709 0

c  -1-1 --> -2
c    ( b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧  b^{6, 193}_0 ∧ -p_1158) -> ( b^{6, 194}_2 ∧  b^{6, 194}_1 ∧ -b^{6, 194}_0)
c  in CNF:
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨  b^{6, 194}_2
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨  b^{6, 194}_1
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨  p_1158 ∨ -b^{6, 194}_0
c  in DIMACS:
-9704  9705 -9706  1158  9707 0
-9704  9705 -9706  1158  9708 0
-9704  9705 -9706  1158 -9709 0

c  -2-1 --> break 
c    ( b^{6, 193}_2 ∧  b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨  b^{6, 193}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-9704 -9705  9706  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{6, 193}_2 ∧ -b^{6, 193}_1 ∧ -b^{6, 193}_0 ∧ true) 
c  in CNF:
c    -b^{6, 193}_2 ∨  b^{6, 193}_1 ∨  b^{6, 193}_0 ∨ false 
c  in DIMACS:
-9704  9705  9706  0

c  3 does not represent an automaton state.
c    -(-b^{6, 193}_2 ∧  b^{6, 193}_1 ∧  b^{6, 193}_0 ∧ true) 
c  in CNF:
c     b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ false 
c  in DIMACS:
 9704 -9705 -9706  0
c  -3 does not represent an automaton state.
c    -( b^{6, 193}_2 ∧  b^{6, 193}_1 ∧  b^{6, 193}_0 ∧ true) 
c  in CNF:
c    -b^{6, 193}_2 ∨ -b^{6, 193}_1 ∨ -b^{6, 193}_0 ∨ false 
c  in DIMACS:
-9704 -9705 -9706  0

c INIT for k = 7
c    -b^{7, 1}_2
c    -b^{7, 1}_1
c    -b^{7, 1}_0
c  in DIMACS:
-9710 0
-9711 0
-9712 0

c Transitions for k = 7
c i = 1
c  -2+1 --> -1
c    ( b^{7, 1}_2 ∧  b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧  p_7) -> ( b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0)
c  in CNF:
c    -b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨  b^{7, 2}_2
c    -b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_1
c    -b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨  b^{7, 2}_0
c  in DIMACS:
-9710 -9711  9712 -7  9713 0
-9710 -9711  9712 -7 -9714 0
-9710 -9711  9712 -7  9715 0

c  -1+1 --> 0
c    ( b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧  b^{7, 1}_0 ∧  p_7) -> (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧ -b^{7, 2}_0)
c  in CNF:
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_2
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_1
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_0
c  in DIMACS:
-9710  9711 -9712 -7 -9713 0
-9710  9711 -9712 -7 -9714 0
-9710  9711 -9712 -7 -9715 0

c  0+1 --> 1
c    (-b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧  p_7) -> (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0)
c  in CNF:
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_2
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_1
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨  b^{7, 2}_0
c  in DIMACS:
 9710  9711  9712 -7 -9713 0
 9710  9711  9712 -7 -9714 0
 9710  9711  9712 -7  9715 0

c  1+1 --> 2
c    (-b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧  b^{7, 1}_0 ∧  p_7) -> (-b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0)
c  in CNF:
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_2
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨  b^{7, 2}_1
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ -p_7 ∨ -b^{7, 2}_0
c  in DIMACS:
 9710  9711 -9712 -7 -9713 0
 9710  9711 -9712 -7  9714 0
 9710  9711 -9712 -7 -9715 0

c  2+1 --> break 
c    (-b^{7, 1}_2 ∧  b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧  p_7) -> break
c  in CNF:
c     b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ -p_7 ∨ break
c  in DIMACS:
 9710 -9711  9712 -7 1162 0


c  2-1 --> 1
c    (-b^{7, 1}_2 ∧  b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧ -p_7) -> (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0)
c  in CNF:
c     b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_2
c     b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_1
c     b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨  b^{7, 2}_0
c  in DIMACS:
 9710 -9711  9712  7 -9713 0
 9710 -9711  9712  7 -9714 0
 9710 -9711  9712  7  9715 0

c  1-1 --> 0
c    (-b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧  b^{7, 1}_0 ∧ -p_7) -> (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧ -b^{7, 2}_0)
c  in CNF:
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_2
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_1
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_0
c  in DIMACS:
 9710  9711 -9712  7 -9713 0
 9710  9711 -9712  7 -9714 0
 9710  9711 -9712  7 -9715 0

c  0-1 --> -1
c    (-b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧ -p_7) -> ( b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0)
c  in CNF:
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨  b^{7, 2}_2
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_1
c     b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨  b^{7, 2}_0
c  in DIMACS:
 9710  9711  9712  7  9713 0
 9710  9711  9712  7 -9714 0
 9710  9711  9712  7  9715 0

c  -1-1 --> -2
c    ( b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧  b^{7, 1}_0 ∧ -p_7) -> ( b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0)
c  in CNF:
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨  b^{7, 2}_2
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨  b^{7, 2}_1
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨  p_7 ∨ -b^{7, 2}_0
c  in DIMACS:
-9710  9711 -9712  7  9713 0
-9710  9711 -9712  7  9714 0
-9710  9711 -9712  7 -9715 0

c  -2-1 --> break 
c    ( b^{7, 1}_2 ∧  b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧ -p_7) -> break
c  in CNF:
c    -b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨  b^{7, 1}_0 ∨  p_7 ∨ break
c  in DIMACS:
-9710 -9711  9712  7 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 1}_2 ∧ -b^{7, 1}_1 ∧ -b^{7, 1}_0 ∧ true) 
c  in CNF:
c    -b^{7, 1}_2 ∨  b^{7, 1}_1 ∨  b^{7, 1}_0 ∨ false 
c  in DIMACS:
-9710  9711  9712  0

c  3 does not represent an automaton state.
c    -(-b^{7, 1}_2 ∧  b^{7, 1}_1 ∧  b^{7, 1}_0 ∧ true) 
c  in CNF:
c     b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ false 
c  in DIMACS:
 9710 -9711 -9712  0
c  -3 does not represent an automaton state.
c    -( b^{7, 1}_2 ∧  b^{7, 1}_1 ∧  b^{7, 1}_0 ∧ true) 
c  in CNF:
c    -b^{7, 1}_2 ∨ -b^{7, 1}_1 ∨ -b^{7, 1}_0 ∨ false 
c  in DIMACS:
-9710 -9711 -9712  0

c i = 2
c  -2+1 --> -1
c    ( b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧  p_14) -> ( b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0)
c  in CNF:
c    -b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨  b^{7, 3}_2
c    -b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_1
c    -b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨  b^{7, 3}_0
c  in DIMACS:
-9713 -9714  9715 -14  9716 0
-9713 -9714  9715 -14 -9717 0
-9713 -9714  9715 -14  9718 0

c  -1+1 --> 0
c    ( b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0 ∧  p_14) -> (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧ -b^{7, 3}_0)
c  in CNF:
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_2
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_1
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_0
c  in DIMACS:
-9713  9714 -9715 -14 -9716 0
-9713  9714 -9715 -14 -9717 0
-9713  9714 -9715 -14 -9718 0

c  0+1 --> 1
c    (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧  p_14) -> (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0)
c  in CNF:
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_2
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_1
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨  b^{7, 3}_0
c  in DIMACS:
 9713  9714  9715 -14 -9716 0
 9713  9714  9715 -14 -9717 0
 9713  9714  9715 -14  9718 0

c  1+1 --> 2
c    (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0 ∧  p_14) -> (-b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0)
c  in CNF:
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_2
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨  b^{7, 3}_1
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ -p_14 ∨ -b^{7, 3}_0
c  in DIMACS:
 9713  9714 -9715 -14 -9716 0
 9713  9714 -9715 -14  9717 0
 9713  9714 -9715 -14 -9718 0

c  2+1 --> break 
c    (-b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧  p_14) -> break
c  in CNF:
c     b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ -p_14 ∨ break
c  in DIMACS:
 9713 -9714  9715 -14 1162 0


c  2-1 --> 1
c    (-b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧ -p_14) -> (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0)
c  in CNF:
c     b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_2
c     b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_1
c     b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨  b^{7, 3}_0
c  in DIMACS:
 9713 -9714  9715  14 -9716 0
 9713 -9714  9715  14 -9717 0
 9713 -9714  9715  14  9718 0

c  1-1 --> 0
c    (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0 ∧ -p_14) -> (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧ -b^{7, 3}_0)
c  in CNF:
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_2
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_1
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_0
c  in DIMACS:
 9713  9714 -9715  14 -9716 0
 9713  9714 -9715  14 -9717 0
 9713  9714 -9715  14 -9718 0

c  0-1 --> -1
c    (-b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧ -p_14) -> ( b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0)
c  in CNF:
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨  b^{7, 3}_2
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_1
c     b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨  b^{7, 3}_0
c  in DIMACS:
 9713  9714  9715  14  9716 0
 9713  9714  9715  14 -9717 0
 9713  9714  9715  14  9718 0

c  -1-1 --> -2
c    ( b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧  b^{7, 2}_0 ∧ -p_14) -> ( b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0)
c  in CNF:
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨  b^{7, 3}_2
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨  b^{7, 3}_1
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨  p_14 ∨ -b^{7, 3}_0
c  in DIMACS:
-9713  9714 -9715  14  9716 0
-9713  9714 -9715  14  9717 0
-9713  9714 -9715  14 -9718 0

c  -2-1 --> break 
c    ( b^{7, 2}_2 ∧  b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧ -p_14) -> break
c  in CNF:
c    -b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨  b^{7, 2}_0 ∨  p_14 ∨ break
c  in DIMACS:
-9713 -9714  9715  14 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 2}_2 ∧ -b^{7, 2}_1 ∧ -b^{7, 2}_0 ∧ true) 
c  in CNF:
c    -b^{7, 2}_2 ∨  b^{7, 2}_1 ∨  b^{7, 2}_0 ∨ false 
c  in DIMACS:
-9713  9714  9715  0

c  3 does not represent an automaton state.
c    -(-b^{7, 2}_2 ∧  b^{7, 2}_1 ∧  b^{7, 2}_0 ∧ true) 
c  in CNF:
c     b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ false 
c  in DIMACS:
 9713 -9714 -9715  0
c  -3 does not represent an automaton state.
c    -( b^{7, 2}_2 ∧  b^{7, 2}_1 ∧  b^{7, 2}_0 ∧ true) 
c  in CNF:
c    -b^{7, 2}_2 ∨ -b^{7, 2}_1 ∨ -b^{7, 2}_0 ∨ false 
c  in DIMACS:
-9713 -9714 -9715  0

c i = 3
c  -2+1 --> -1
c    ( b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧  p_21) -> ( b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0)
c  in CNF:
c    -b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨  b^{7, 4}_2
c    -b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_1
c    -b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨  b^{7, 4}_0
c  in DIMACS:
-9716 -9717  9718 -21  9719 0
-9716 -9717  9718 -21 -9720 0
-9716 -9717  9718 -21  9721 0

c  -1+1 --> 0
c    ( b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0 ∧  p_21) -> (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧ -b^{7, 4}_0)
c  in CNF:
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_2
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_1
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_0
c  in DIMACS:
-9716  9717 -9718 -21 -9719 0
-9716  9717 -9718 -21 -9720 0
-9716  9717 -9718 -21 -9721 0

c  0+1 --> 1
c    (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧  p_21) -> (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0)
c  in CNF:
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_2
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_1
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨  b^{7, 4}_0
c  in DIMACS:
 9716  9717  9718 -21 -9719 0
 9716  9717  9718 -21 -9720 0
 9716  9717  9718 -21  9721 0

c  1+1 --> 2
c    (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0 ∧  p_21) -> (-b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0)
c  in CNF:
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_2
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨  b^{7, 4}_1
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ -p_21 ∨ -b^{7, 4}_0
c  in DIMACS:
 9716  9717 -9718 -21 -9719 0
 9716  9717 -9718 -21  9720 0
 9716  9717 -9718 -21 -9721 0

c  2+1 --> break 
c    (-b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧  p_21) -> break
c  in CNF:
c     b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ -p_21 ∨ break
c  in DIMACS:
 9716 -9717  9718 -21 1162 0


c  2-1 --> 1
c    (-b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧ -p_21) -> (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0)
c  in CNF:
c     b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_2
c     b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_1
c     b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨  b^{7, 4}_0
c  in DIMACS:
 9716 -9717  9718  21 -9719 0
 9716 -9717  9718  21 -9720 0
 9716 -9717  9718  21  9721 0

c  1-1 --> 0
c    (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0 ∧ -p_21) -> (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧ -b^{7, 4}_0)
c  in CNF:
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_2
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_1
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_0
c  in DIMACS:
 9716  9717 -9718  21 -9719 0
 9716  9717 -9718  21 -9720 0
 9716  9717 -9718  21 -9721 0

c  0-1 --> -1
c    (-b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧ -p_21) -> ( b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0)
c  in CNF:
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨  b^{7, 4}_2
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_1
c     b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨  b^{7, 4}_0
c  in DIMACS:
 9716  9717  9718  21  9719 0
 9716  9717  9718  21 -9720 0
 9716  9717  9718  21  9721 0

c  -1-1 --> -2
c    ( b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧  b^{7, 3}_0 ∧ -p_21) -> ( b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0)
c  in CNF:
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨  b^{7, 4}_2
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨  b^{7, 4}_1
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨  p_21 ∨ -b^{7, 4}_0
c  in DIMACS:
-9716  9717 -9718  21  9719 0
-9716  9717 -9718  21  9720 0
-9716  9717 -9718  21 -9721 0

c  -2-1 --> break 
c    ( b^{7, 3}_2 ∧  b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧ -p_21) -> break
c  in CNF:
c    -b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨  b^{7, 3}_0 ∨  p_21 ∨ break
c  in DIMACS:
-9716 -9717  9718  21 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 3}_2 ∧ -b^{7, 3}_1 ∧ -b^{7, 3}_0 ∧ true) 
c  in CNF:
c    -b^{7, 3}_2 ∨  b^{7, 3}_1 ∨  b^{7, 3}_0 ∨ false 
c  in DIMACS:
-9716  9717  9718  0

c  3 does not represent an automaton state.
c    -(-b^{7, 3}_2 ∧  b^{7, 3}_1 ∧  b^{7, 3}_0 ∧ true) 
c  in CNF:
c     b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ false 
c  in DIMACS:
 9716 -9717 -9718  0
c  -3 does not represent an automaton state.
c    -( b^{7, 3}_2 ∧  b^{7, 3}_1 ∧  b^{7, 3}_0 ∧ true) 
c  in CNF:
c    -b^{7, 3}_2 ∨ -b^{7, 3}_1 ∨ -b^{7, 3}_0 ∨ false 
c  in DIMACS:
-9716 -9717 -9718  0

c i = 4
c  -2+1 --> -1
c    ( b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧  p_28) -> ( b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0)
c  in CNF:
c    -b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨  b^{7, 5}_2
c    -b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_1
c    -b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨  b^{7, 5}_0
c  in DIMACS:
-9719 -9720  9721 -28  9722 0
-9719 -9720  9721 -28 -9723 0
-9719 -9720  9721 -28  9724 0

c  -1+1 --> 0
c    ( b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0 ∧  p_28) -> (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧ -b^{7, 5}_0)
c  in CNF:
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_2
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_1
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_0
c  in DIMACS:
-9719  9720 -9721 -28 -9722 0
-9719  9720 -9721 -28 -9723 0
-9719  9720 -9721 -28 -9724 0

c  0+1 --> 1
c    (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧  p_28) -> (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0)
c  in CNF:
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_2
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_1
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨  b^{7, 5}_0
c  in DIMACS:
 9719  9720  9721 -28 -9722 0
 9719  9720  9721 -28 -9723 0
 9719  9720  9721 -28  9724 0

c  1+1 --> 2
c    (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0 ∧  p_28) -> (-b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0)
c  in CNF:
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_2
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨  b^{7, 5}_1
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ -p_28 ∨ -b^{7, 5}_0
c  in DIMACS:
 9719  9720 -9721 -28 -9722 0
 9719  9720 -9721 -28  9723 0
 9719  9720 -9721 -28 -9724 0

c  2+1 --> break 
c    (-b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧  p_28) -> break
c  in CNF:
c     b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 9719 -9720  9721 -28 1162 0


c  2-1 --> 1
c    (-b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧ -p_28) -> (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0)
c  in CNF:
c     b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_2
c     b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_1
c     b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨  b^{7, 5}_0
c  in DIMACS:
 9719 -9720  9721  28 -9722 0
 9719 -9720  9721  28 -9723 0
 9719 -9720  9721  28  9724 0

c  1-1 --> 0
c    (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0 ∧ -p_28) -> (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧ -b^{7, 5}_0)
c  in CNF:
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_2
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_1
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_0
c  in DIMACS:
 9719  9720 -9721  28 -9722 0
 9719  9720 -9721  28 -9723 0
 9719  9720 -9721  28 -9724 0

c  0-1 --> -1
c    (-b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧ -p_28) -> ( b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0)
c  in CNF:
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨  b^{7, 5}_2
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_1
c     b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨  b^{7, 5}_0
c  in DIMACS:
 9719  9720  9721  28  9722 0
 9719  9720  9721  28 -9723 0
 9719  9720  9721  28  9724 0

c  -1-1 --> -2
c    ( b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧  b^{7, 4}_0 ∧ -p_28) -> ( b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0)
c  in CNF:
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨  b^{7, 5}_2
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨  b^{7, 5}_1
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨  p_28 ∨ -b^{7, 5}_0
c  in DIMACS:
-9719  9720 -9721  28  9722 0
-9719  9720 -9721  28  9723 0
-9719  9720 -9721  28 -9724 0

c  -2-1 --> break 
c    ( b^{7, 4}_2 ∧  b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨  b^{7, 4}_0 ∨  p_28 ∨ break
c  in DIMACS:
-9719 -9720  9721  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 4}_2 ∧ -b^{7, 4}_1 ∧ -b^{7, 4}_0 ∧ true) 
c  in CNF:
c    -b^{7, 4}_2 ∨  b^{7, 4}_1 ∨  b^{7, 4}_0 ∨ false 
c  in DIMACS:
-9719  9720  9721  0

c  3 does not represent an automaton state.
c    -(-b^{7, 4}_2 ∧  b^{7, 4}_1 ∧  b^{7, 4}_0 ∧ true) 
c  in CNF:
c     b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ false 
c  in DIMACS:
 9719 -9720 -9721  0
c  -3 does not represent an automaton state.
c    -( b^{7, 4}_2 ∧  b^{7, 4}_1 ∧  b^{7, 4}_0 ∧ true) 
c  in CNF:
c    -b^{7, 4}_2 ∨ -b^{7, 4}_1 ∨ -b^{7, 4}_0 ∨ false 
c  in DIMACS:
-9719 -9720 -9721  0

c i = 5
c  -2+1 --> -1
c    ( b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧  p_35) -> ( b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0)
c  in CNF:
c    -b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨  b^{7, 6}_2
c    -b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_1
c    -b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨  b^{7, 6}_0
c  in DIMACS:
-9722 -9723  9724 -35  9725 0
-9722 -9723  9724 -35 -9726 0
-9722 -9723  9724 -35  9727 0

c  -1+1 --> 0
c    ( b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0 ∧  p_35) -> (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧ -b^{7, 6}_0)
c  in CNF:
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_2
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_1
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_0
c  in DIMACS:
-9722  9723 -9724 -35 -9725 0
-9722  9723 -9724 -35 -9726 0
-9722  9723 -9724 -35 -9727 0

c  0+1 --> 1
c    (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧  p_35) -> (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0)
c  in CNF:
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_2
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_1
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨  b^{7, 6}_0
c  in DIMACS:
 9722  9723  9724 -35 -9725 0
 9722  9723  9724 -35 -9726 0
 9722  9723  9724 -35  9727 0

c  1+1 --> 2
c    (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0 ∧  p_35) -> (-b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0)
c  in CNF:
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_2
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨  b^{7, 6}_1
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ -p_35 ∨ -b^{7, 6}_0
c  in DIMACS:
 9722  9723 -9724 -35 -9725 0
 9722  9723 -9724 -35  9726 0
 9722  9723 -9724 -35 -9727 0

c  2+1 --> break 
c    (-b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧  p_35) -> break
c  in CNF:
c     b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ -p_35 ∨ break
c  in DIMACS:
 9722 -9723  9724 -35 1162 0


c  2-1 --> 1
c    (-b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧ -p_35) -> (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0)
c  in CNF:
c     b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_2
c     b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_1
c     b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨  b^{7, 6}_0
c  in DIMACS:
 9722 -9723  9724  35 -9725 0
 9722 -9723  9724  35 -9726 0
 9722 -9723  9724  35  9727 0

c  1-1 --> 0
c    (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0 ∧ -p_35) -> (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧ -b^{7, 6}_0)
c  in CNF:
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_2
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_1
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_0
c  in DIMACS:
 9722  9723 -9724  35 -9725 0
 9722  9723 -9724  35 -9726 0
 9722  9723 -9724  35 -9727 0

c  0-1 --> -1
c    (-b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧ -p_35) -> ( b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0)
c  in CNF:
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨  b^{7, 6}_2
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_1
c     b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨  b^{7, 6}_0
c  in DIMACS:
 9722  9723  9724  35  9725 0
 9722  9723  9724  35 -9726 0
 9722  9723  9724  35  9727 0

c  -1-1 --> -2
c    ( b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧  b^{7, 5}_0 ∧ -p_35) -> ( b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0)
c  in CNF:
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨  b^{7, 6}_2
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨  b^{7, 6}_1
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨  p_35 ∨ -b^{7, 6}_0
c  in DIMACS:
-9722  9723 -9724  35  9725 0
-9722  9723 -9724  35  9726 0
-9722  9723 -9724  35 -9727 0

c  -2-1 --> break 
c    ( b^{7, 5}_2 ∧  b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧ -p_35) -> break
c  in CNF:
c    -b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨  b^{7, 5}_0 ∨  p_35 ∨ break
c  in DIMACS:
-9722 -9723  9724  35 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 5}_2 ∧ -b^{7, 5}_1 ∧ -b^{7, 5}_0 ∧ true) 
c  in CNF:
c    -b^{7, 5}_2 ∨  b^{7, 5}_1 ∨  b^{7, 5}_0 ∨ false 
c  in DIMACS:
-9722  9723  9724  0

c  3 does not represent an automaton state.
c    -(-b^{7, 5}_2 ∧  b^{7, 5}_1 ∧  b^{7, 5}_0 ∧ true) 
c  in CNF:
c     b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ false 
c  in DIMACS:
 9722 -9723 -9724  0
c  -3 does not represent an automaton state.
c    -( b^{7, 5}_2 ∧  b^{7, 5}_1 ∧  b^{7, 5}_0 ∧ true) 
c  in CNF:
c    -b^{7, 5}_2 ∨ -b^{7, 5}_1 ∨ -b^{7, 5}_0 ∨ false 
c  in DIMACS:
-9722 -9723 -9724  0

c i = 6
c  -2+1 --> -1
c    ( b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧  p_42) -> ( b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0)
c  in CNF:
c    -b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨  b^{7, 7}_2
c    -b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_1
c    -b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨  b^{7, 7}_0
c  in DIMACS:
-9725 -9726  9727 -42  9728 0
-9725 -9726  9727 -42 -9729 0
-9725 -9726  9727 -42  9730 0

c  -1+1 --> 0
c    ( b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0 ∧  p_42) -> (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧ -b^{7, 7}_0)
c  in CNF:
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_2
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_1
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_0
c  in DIMACS:
-9725  9726 -9727 -42 -9728 0
-9725  9726 -9727 -42 -9729 0
-9725  9726 -9727 -42 -9730 0

c  0+1 --> 1
c    (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧  p_42) -> (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0)
c  in CNF:
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_2
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_1
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨  b^{7, 7}_0
c  in DIMACS:
 9725  9726  9727 -42 -9728 0
 9725  9726  9727 -42 -9729 0
 9725  9726  9727 -42  9730 0

c  1+1 --> 2
c    (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0 ∧  p_42) -> (-b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0)
c  in CNF:
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_2
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨  b^{7, 7}_1
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ -p_42 ∨ -b^{7, 7}_0
c  in DIMACS:
 9725  9726 -9727 -42 -9728 0
 9725  9726 -9727 -42  9729 0
 9725  9726 -9727 -42 -9730 0

c  2+1 --> break 
c    (-b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧  p_42) -> break
c  in CNF:
c     b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 9725 -9726  9727 -42 1162 0


c  2-1 --> 1
c    (-b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧ -p_42) -> (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0)
c  in CNF:
c     b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_2
c     b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_1
c     b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨  b^{7, 7}_0
c  in DIMACS:
 9725 -9726  9727  42 -9728 0
 9725 -9726  9727  42 -9729 0
 9725 -9726  9727  42  9730 0

c  1-1 --> 0
c    (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0 ∧ -p_42) -> (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧ -b^{7, 7}_0)
c  in CNF:
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_2
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_1
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_0
c  in DIMACS:
 9725  9726 -9727  42 -9728 0
 9725  9726 -9727  42 -9729 0
 9725  9726 -9727  42 -9730 0

c  0-1 --> -1
c    (-b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧ -p_42) -> ( b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0)
c  in CNF:
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨  b^{7, 7}_2
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_1
c     b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨  b^{7, 7}_0
c  in DIMACS:
 9725  9726  9727  42  9728 0
 9725  9726  9727  42 -9729 0
 9725  9726  9727  42  9730 0

c  -1-1 --> -2
c    ( b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧  b^{7, 6}_0 ∧ -p_42) -> ( b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0)
c  in CNF:
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨  b^{7, 7}_2
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨  b^{7, 7}_1
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨  p_42 ∨ -b^{7, 7}_0
c  in DIMACS:
-9725  9726 -9727  42  9728 0
-9725  9726 -9727  42  9729 0
-9725  9726 -9727  42 -9730 0

c  -2-1 --> break 
c    ( b^{7, 6}_2 ∧  b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨  b^{7, 6}_0 ∨  p_42 ∨ break
c  in DIMACS:
-9725 -9726  9727  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 6}_2 ∧ -b^{7, 6}_1 ∧ -b^{7, 6}_0 ∧ true) 
c  in CNF:
c    -b^{7, 6}_2 ∨  b^{7, 6}_1 ∨  b^{7, 6}_0 ∨ false 
c  in DIMACS:
-9725  9726  9727  0

c  3 does not represent an automaton state.
c    -(-b^{7, 6}_2 ∧  b^{7, 6}_1 ∧  b^{7, 6}_0 ∧ true) 
c  in CNF:
c     b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ false 
c  in DIMACS:
 9725 -9726 -9727  0
c  -3 does not represent an automaton state.
c    -( b^{7, 6}_2 ∧  b^{7, 6}_1 ∧  b^{7, 6}_0 ∧ true) 
c  in CNF:
c    -b^{7, 6}_2 ∨ -b^{7, 6}_1 ∨ -b^{7, 6}_0 ∨ false 
c  in DIMACS:
-9725 -9726 -9727  0

c i = 7
c  -2+1 --> -1
c    ( b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧  p_49) -> ( b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0)
c  in CNF:
c    -b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨  b^{7, 8}_2
c    -b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_1
c    -b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨  b^{7, 8}_0
c  in DIMACS:
-9728 -9729  9730 -49  9731 0
-9728 -9729  9730 -49 -9732 0
-9728 -9729  9730 -49  9733 0

c  -1+1 --> 0
c    ( b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0 ∧  p_49) -> (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧ -b^{7, 8}_0)
c  in CNF:
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_2
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_1
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_0
c  in DIMACS:
-9728  9729 -9730 -49 -9731 0
-9728  9729 -9730 -49 -9732 0
-9728  9729 -9730 -49 -9733 0

c  0+1 --> 1
c    (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧  p_49) -> (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0)
c  in CNF:
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_2
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_1
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨  b^{7, 8}_0
c  in DIMACS:
 9728  9729  9730 -49 -9731 0
 9728  9729  9730 -49 -9732 0
 9728  9729  9730 -49  9733 0

c  1+1 --> 2
c    (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0 ∧  p_49) -> (-b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0)
c  in CNF:
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_2
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨  b^{7, 8}_1
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ -p_49 ∨ -b^{7, 8}_0
c  in DIMACS:
 9728  9729 -9730 -49 -9731 0
 9728  9729 -9730 -49  9732 0
 9728  9729 -9730 -49 -9733 0

c  2+1 --> break 
c    (-b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧  p_49) -> break
c  in CNF:
c     b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ -p_49 ∨ break
c  in DIMACS:
 9728 -9729  9730 -49 1162 0


c  2-1 --> 1
c    (-b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧ -p_49) -> (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0)
c  in CNF:
c     b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_2
c     b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_1
c     b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨  b^{7, 8}_0
c  in DIMACS:
 9728 -9729  9730  49 -9731 0
 9728 -9729  9730  49 -9732 0
 9728 -9729  9730  49  9733 0

c  1-1 --> 0
c    (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0 ∧ -p_49) -> (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧ -b^{7, 8}_0)
c  in CNF:
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_2
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_1
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_0
c  in DIMACS:
 9728  9729 -9730  49 -9731 0
 9728  9729 -9730  49 -9732 0
 9728  9729 -9730  49 -9733 0

c  0-1 --> -1
c    (-b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧ -p_49) -> ( b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0)
c  in CNF:
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨  b^{7, 8}_2
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_1
c     b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨  b^{7, 8}_0
c  in DIMACS:
 9728  9729  9730  49  9731 0
 9728  9729  9730  49 -9732 0
 9728  9729  9730  49  9733 0

c  -1-1 --> -2
c    ( b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧  b^{7, 7}_0 ∧ -p_49) -> ( b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0)
c  in CNF:
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨  b^{7, 8}_2
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨  b^{7, 8}_1
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨  p_49 ∨ -b^{7, 8}_0
c  in DIMACS:
-9728  9729 -9730  49  9731 0
-9728  9729 -9730  49  9732 0
-9728  9729 -9730  49 -9733 0

c  -2-1 --> break 
c    ( b^{7, 7}_2 ∧  b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧ -p_49) -> break
c  in CNF:
c    -b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨  b^{7, 7}_0 ∨  p_49 ∨ break
c  in DIMACS:
-9728 -9729  9730  49 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 7}_2 ∧ -b^{7, 7}_1 ∧ -b^{7, 7}_0 ∧ true) 
c  in CNF:
c    -b^{7, 7}_2 ∨  b^{7, 7}_1 ∨  b^{7, 7}_0 ∨ false 
c  in DIMACS:
-9728  9729  9730  0

c  3 does not represent an automaton state.
c    -(-b^{7, 7}_2 ∧  b^{7, 7}_1 ∧  b^{7, 7}_0 ∧ true) 
c  in CNF:
c     b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ false 
c  in DIMACS:
 9728 -9729 -9730  0
c  -3 does not represent an automaton state.
c    -( b^{7, 7}_2 ∧  b^{7, 7}_1 ∧  b^{7, 7}_0 ∧ true) 
c  in CNF:
c    -b^{7, 7}_2 ∨ -b^{7, 7}_1 ∨ -b^{7, 7}_0 ∨ false 
c  in DIMACS:
-9728 -9729 -9730  0

c i = 8
c  -2+1 --> -1
c    ( b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧  p_56) -> ( b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0)
c  in CNF:
c    -b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨  b^{7, 9}_2
c    -b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_1
c    -b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨  b^{7, 9}_0
c  in DIMACS:
-9731 -9732  9733 -56  9734 0
-9731 -9732  9733 -56 -9735 0
-9731 -9732  9733 -56  9736 0

c  -1+1 --> 0
c    ( b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0 ∧  p_56) -> (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧ -b^{7, 9}_0)
c  in CNF:
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_2
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_1
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_0
c  in DIMACS:
-9731  9732 -9733 -56 -9734 0
-9731  9732 -9733 -56 -9735 0
-9731  9732 -9733 -56 -9736 0

c  0+1 --> 1
c    (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧  p_56) -> (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0)
c  in CNF:
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_2
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_1
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨  b^{7, 9}_0
c  in DIMACS:
 9731  9732  9733 -56 -9734 0
 9731  9732  9733 -56 -9735 0
 9731  9732  9733 -56  9736 0

c  1+1 --> 2
c    (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0 ∧  p_56) -> (-b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0)
c  in CNF:
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_2
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨  b^{7, 9}_1
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ -p_56 ∨ -b^{7, 9}_0
c  in DIMACS:
 9731  9732 -9733 -56 -9734 0
 9731  9732 -9733 -56  9735 0
 9731  9732 -9733 -56 -9736 0

c  2+1 --> break 
c    (-b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧  p_56) -> break
c  in CNF:
c     b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 9731 -9732  9733 -56 1162 0


c  2-1 --> 1
c    (-b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧ -p_56) -> (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0)
c  in CNF:
c     b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_2
c     b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_1
c     b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨  b^{7, 9}_0
c  in DIMACS:
 9731 -9732  9733  56 -9734 0
 9731 -9732  9733  56 -9735 0
 9731 -9732  9733  56  9736 0

c  1-1 --> 0
c    (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0 ∧ -p_56) -> (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧ -b^{7, 9}_0)
c  in CNF:
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_2
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_1
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_0
c  in DIMACS:
 9731  9732 -9733  56 -9734 0
 9731  9732 -9733  56 -9735 0
 9731  9732 -9733  56 -9736 0

c  0-1 --> -1
c    (-b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧ -p_56) -> ( b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0)
c  in CNF:
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨  b^{7, 9}_2
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_1
c     b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨  b^{7, 9}_0
c  in DIMACS:
 9731  9732  9733  56  9734 0
 9731  9732  9733  56 -9735 0
 9731  9732  9733  56  9736 0

c  -1-1 --> -2
c    ( b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧  b^{7, 8}_0 ∧ -p_56) -> ( b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0)
c  in CNF:
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨  b^{7, 9}_2
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨  b^{7, 9}_1
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨  p_56 ∨ -b^{7, 9}_0
c  in DIMACS:
-9731  9732 -9733  56  9734 0
-9731  9732 -9733  56  9735 0
-9731  9732 -9733  56 -9736 0

c  -2-1 --> break 
c    ( b^{7, 8}_2 ∧  b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨  b^{7, 8}_0 ∨  p_56 ∨ break
c  in DIMACS:
-9731 -9732  9733  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 8}_2 ∧ -b^{7, 8}_1 ∧ -b^{7, 8}_0 ∧ true) 
c  in CNF:
c    -b^{7, 8}_2 ∨  b^{7, 8}_1 ∨  b^{7, 8}_0 ∨ false 
c  in DIMACS:
-9731  9732  9733  0

c  3 does not represent an automaton state.
c    -(-b^{7, 8}_2 ∧  b^{7, 8}_1 ∧  b^{7, 8}_0 ∧ true) 
c  in CNF:
c     b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ false 
c  in DIMACS:
 9731 -9732 -9733  0
c  -3 does not represent an automaton state.
c    -( b^{7, 8}_2 ∧  b^{7, 8}_1 ∧  b^{7, 8}_0 ∧ true) 
c  in CNF:
c    -b^{7, 8}_2 ∨ -b^{7, 8}_1 ∨ -b^{7, 8}_0 ∨ false 
c  in DIMACS:
-9731 -9732 -9733  0

c i = 9
c  -2+1 --> -1
c    ( b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧  p_63) -> ( b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0)
c  in CNF:
c    -b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨  b^{7, 10}_2
c    -b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_1
c    -b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨  b^{7, 10}_0
c  in DIMACS:
-9734 -9735  9736 -63  9737 0
-9734 -9735  9736 -63 -9738 0
-9734 -9735  9736 -63  9739 0

c  -1+1 --> 0
c    ( b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0 ∧  p_63) -> (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧ -b^{7, 10}_0)
c  in CNF:
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_2
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_1
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_0
c  in DIMACS:
-9734  9735 -9736 -63 -9737 0
-9734  9735 -9736 -63 -9738 0
-9734  9735 -9736 -63 -9739 0

c  0+1 --> 1
c    (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧  p_63) -> (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0)
c  in CNF:
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_2
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_1
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨  b^{7, 10}_0
c  in DIMACS:
 9734  9735  9736 -63 -9737 0
 9734  9735  9736 -63 -9738 0
 9734  9735  9736 -63  9739 0

c  1+1 --> 2
c    (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0 ∧  p_63) -> (-b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0)
c  in CNF:
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_2
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨  b^{7, 10}_1
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ -p_63 ∨ -b^{7, 10}_0
c  in DIMACS:
 9734  9735 -9736 -63 -9737 0
 9734  9735 -9736 -63  9738 0
 9734  9735 -9736 -63 -9739 0

c  2+1 --> break 
c    (-b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧  p_63) -> break
c  in CNF:
c     b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 9734 -9735  9736 -63 1162 0


c  2-1 --> 1
c    (-b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧ -p_63) -> (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0)
c  in CNF:
c     b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_2
c     b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_1
c     b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨  b^{7, 10}_0
c  in DIMACS:
 9734 -9735  9736  63 -9737 0
 9734 -9735  9736  63 -9738 0
 9734 -9735  9736  63  9739 0

c  1-1 --> 0
c    (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0 ∧ -p_63) -> (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧ -b^{7, 10}_0)
c  in CNF:
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_2
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_1
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_0
c  in DIMACS:
 9734  9735 -9736  63 -9737 0
 9734  9735 -9736  63 -9738 0
 9734  9735 -9736  63 -9739 0

c  0-1 --> -1
c    (-b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧ -p_63) -> ( b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0)
c  in CNF:
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨  b^{7, 10}_2
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_1
c     b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨  b^{7, 10}_0
c  in DIMACS:
 9734  9735  9736  63  9737 0
 9734  9735  9736  63 -9738 0
 9734  9735  9736  63  9739 0

c  -1-1 --> -2
c    ( b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧  b^{7, 9}_0 ∧ -p_63) -> ( b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0)
c  in CNF:
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨  b^{7, 10}_2
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨  b^{7, 10}_1
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨  p_63 ∨ -b^{7, 10}_0
c  in DIMACS:
-9734  9735 -9736  63  9737 0
-9734  9735 -9736  63  9738 0
-9734  9735 -9736  63 -9739 0

c  -2-1 --> break 
c    ( b^{7, 9}_2 ∧  b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨  b^{7, 9}_0 ∨  p_63 ∨ break
c  in DIMACS:
-9734 -9735  9736  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 9}_2 ∧ -b^{7, 9}_1 ∧ -b^{7, 9}_0 ∧ true) 
c  in CNF:
c    -b^{7, 9}_2 ∨  b^{7, 9}_1 ∨  b^{7, 9}_0 ∨ false 
c  in DIMACS:
-9734  9735  9736  0

c  3 does not represent an automaton state.
c    -(-b^{7, 9}_2 ∧  b^{7, 9}_1 ∧  b^{7, 9}_0 ∧ true) 
c  in CNF:
c     b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ false 
c  in DIMACS:
 9734 -9735 -9736  0
c  -3 does not represent an automaton state.
c    -( b^{7, 9}_2 ∧  b^{7, 9}_1 ∧  b^{7, 9}_0 ∧ true) 
c  in CNF:
c    -b^{7, 9}_2 ∨ -b^{7, 9}_1 ∨ -b^{7, 9}_0 ∨ false 
c  in DIMACS:
-9734 -9735 -9736  0

c i = 10
c  -2+1 --> -1
c    ( b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧  p_70) -> ( b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0)
c  in CNF:
c    -b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨  b^{7, 11}_2
c    -b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_1
c    -b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨  b^{7, 11}_0
c  in DIMACS:
-9737 -9738  9739 -70  9740 0
-9737 -9738  9739 -70 -9741 0
-9737 -9738  9739 -70  9742 0

c  -1+1 --> 0
c    ( b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0 ∧  p_70) -> (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧ -b^{7, 11}_0)
c  in CNF:
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_2
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_1
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_0
c  in DIMACS:
-9737  9738 -9739 -70 -9740 0
-9737  9738 -9739 -70 -9741 0
-9737  9738 -9739 -70 -9742 0

c  0+1 --> 1
c    (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧  p_70) -> (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0)
c  in CNF:
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_2
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_1
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨  b^{7, 11}_0
c  in DIMACS:
 9737  9738  9739 -70 -9740 0
 9737  9738  9739 -70 -9741 0
 9737  9738  9739 -70  9742 0

c  1+1 --> 2
c    (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0 ∧  p_70) -> (-b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0)
c  in CNF:
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_2
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨  b^{7, 11}_1
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ -p_70 ∨ -b^{7, 11}_0
c  in DIMACS:
 9737  9738 -9739 -70 -9740 0
 9737  9738 -9739 -70  9741 0
 9737  9738 -9739 -70 -9742 0

c  2+1 --> break 
c    (-b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧  p_70) -> break
c  in CNF:
c     b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 9737 -9738  9739 -70 1162 0


c  2-1 --> 1
c    (-b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧ -p_70) -> (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0)
c  in CNF:
c     b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_2
c     b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_1
c     b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨  b^{7, 11}_0
c  in DIMACS:
 9737 -9738  9739  70 -9740 0
 9737 -9738  9739  70 -9741 0
 9737 -9738  9739  70  9742 0

c  1-1 --> 0
c    (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0 ∧ -p_70) -> (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧ -b^{7, 11}_0)
c  in CNF:
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_2
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_1
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_0
c  in DIMACS:
 9737  9738 -9739  70 -9740 0
 9737  9738 -9739  70 -9741 0
 9737  9738 -9739  70 -9742 0

c  0-1 --> -1
c    (-b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧ -p_70) -> ( b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0)
c  in CNF:
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨  b^{7, 11}_2
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_1
c     b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨  b^{7, 11}_0
c  in DIMACS:
 9737  9738  9739  70  9740 0
 9737  9738  9739  70 -9741 0
 9737  9738  9739  70  9742 0

c  -1-1 --> -2
c    ( b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧  b^{7, 10}_0 ∧ -p_70) -> ( b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0)
c  in CNF:
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨  b^{7, 11}_2
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨  b^{7, 11}_1
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨  p_70 ∨ -b^{7, 11}_0
c  in DIMACS:
-9737  9738 -9739  70  9740 0
-9737  9738 -9739  70  9741 0
-9737  9738 -9739  70 -9742 0

c  -2-1 --> break 
c    ( b^{7, 10}_2 ∧  b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨  b^{7, 10}_0 ∨  p_70 ∨ break
c  in DIMACS:
-9737 -9738  9739  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 10}_2 ∧ -b^{7, 10}_1 ∧ -b^{7, 10}_0 ∧ true) 
c  in CNF:
c    -b^{7, 10}_2 ∨  b^{7, 10}_1 ∨  b^{7, 10}_0 ∨ false 
c  in DIMACS:
-9737  9738  9739  0

c  3 does not represent an automaton state.
c    -(-b^{7, 10}_2 ∧  b^{7, 10}_1 ∧  b^{7, 10}_0 ∧ true) 
c  in CNF:
c     b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ false 
c  in DIMACS:
 9737 -9738 -9739  0
c  -3 does not represent an automaton state.
c    -( b^{7, 10}_2 ∧  b^{7, 10}_1 ∧  b^{7, 10}_0 ∧ true) 
c  in CNF:
c    -b^{7, 10}_2 ∨ -b^{7, 10}_1 ∨ -b^{7, 10}_0 ∨ false 
c  in DIMACS:
-9737 -9738 -9739  0

c i = 11
c  -2+1 --> -1
c    ( b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧  p_77) -> ( b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0)
c  in CNF:
c    -b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨  b^{7, 12}_2
c    -b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_1
c    -b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨  b^{7, 12}_0
c  in DIMACS:
-9740 -9741  9742 -77  9743 0
-9740 -9741  9742 -77 -9744 0
-9740 -9741  9742 -77  9745 0

c  -1+1 --> 0
c    ( b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0 ∧  p_77) -> (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧ -b^{7, 12}_0)
c  in CNF:
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_2
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_1
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_0
c  in DIMACS:
-9740  9741 -9742 -77 -9743 0
-9740  9741 -9742 -77 -9744 0
-9740  9741 -9742 -77 -9745 0

c  0+1 --> 1
c    (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧  p_77) -> (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0)
c  in CNF:
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_2
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_1
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨  b^{7, 12}_0
c  in DIMACS:
 9740  9741  9742 -77 -9743 0
 9740  9741  9742 -77 -9744 0
 9740  9741  9742 -77  9745 0

c  1+1 --> 2
c    (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0 ∧  p_77) -> (-b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0)
c  in CNF:
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_2
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨  b^{7, 12}_1
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ -p_77 ∨ -b^{7, 12}_0
c  in DIMACS:
 9740  9741 -9742 -77 -9743 0
 9740  9741 -9742 -77  9744 0
 9740  9741 -9742 -77 -9745 0

c  2+1 --> break 
c    (-b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧  p_77) -> break
c  in CNF:
c     b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ -p_77 ∨ break
c  in DIMACS:
 9740 -9741  9742 -77 1162 0


c  2-1 --> 1
c    (-b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧ -p_77) -> (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0)
c  in CNF:
c     b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_2
c     b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_1
c     b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨  b^{7, 12}_0
c  in DIMACS:
 9740 -9741  9742  77 -9743 0
 9740 -9741  9742  77 -9744 0
 9740 -9741  9742  77  9745 0

c  1-1 --> 0
c    (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0 ∧ -p_77) -> (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧ -b^{7, 12}_0)
c  in CNF:
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_2
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_1
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_0
c  in DIMACS:
 9740  9741 -9742  77 -9743 0
 9740  9741 -9742  77 -9744 0
 9740  9741 -9742  77 -9745 0

c  0-1 --> -1
c    (-b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧ -p_77) -> ( b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0)
c  in CNF:
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨  b^{7, 12}_2
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_1
c     b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨  b^{7, 12}_0
c  in DIMACS:
 9740  9741  9742  77  9743 0
 9740  9741  9742  77 -9744 0
 9740  9741  9742  77  9745 0

c  -1-1 --> -2
c    ( b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧  b^{7, 11}_0 ∧ -p_77) -> ( b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0)
c  in CNF:
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨  b^{7, 12}_2
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨  b^{7, 12}_1
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨  p_77 ∨ -b^{7, 12}_0
c  in DIMACS:
-9740  9741 -9742  77  9743 0
-9740  9741 -9742  77  9744 0
-9740  9741 -9742  77 -9745 0

c  -2-1 --> break 
c    ( b^{7, 11}_2 ∧  b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧ -p_77) -> break
c  in CNF:
c    -b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨  b^{7, 11}_0 ∨  p_77 ∨ break
c  in DIMACS:
-9740 -9741  9742  77 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 11}_2 ∧ -b^{7, 11}_1 ∧ -b^{7, 11}_0 ∧ true) 
c  in CNF:
c    -b^{7, 11}_2 ∨  b^{7, 11}_1 ∨  b^{7, 11}_0 ∨ false 
c  in DIMACS:
-9740  9741  9742  0

c  3 does not represent an automaton state.
c    -(-b^{7, 11}_2 ∧  b^{7, 11}_1 ∧  b^{7, 11}_0 ∧ true) 
c  in CNF:
c     b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ false 
c  in DIMACS:
 9740 -9741 -9742  0
c  -3 does not represent an automaton state.
c    -( b^{7, 11}_2 ∧  b^{7, 11}_1 ∧  b^{7, 11}_0 ∧ true) 
c  in CNF:
c    -b^{7, 11}_2 ∨ -b^{7, 11}_1 ∨ -b^{7, 11}_0 ∨ false 
c  in DIMACS:
-9740 -9741 -9742  0

c i = 12
c  -2+1 --> -1
c    ( b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧  p_84) -> ( b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0)
c  in CNF:
c    -b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨  b^{7, 13}_2
c    -b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_1
c    -b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨  b^{7, 13}_0
c  in DIMACS:
-9743 -9744  9745 -84  9746 0
-9743 -9744  9745 -84 -9747 0
-9743 -9744  9745 -84  9748 0

c  -1+1 --> 0
c    ( b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0 ∧  p_84) -> (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧ -b^{7, 13}_0)
c  in CNF:
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_2
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_1
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_0
c  in DIMACS:
-9743  9744 -9745 -84 -9746 0
-9743  9744 -9745 -84 -9747 0
-9743  9744 -9745 -84 -9748 0

c  0+1 --> 1
c    (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧  p_84) -> (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0)
c  in CNF:
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_2
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_1
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨  b^{7, 13}_0
c  in DIMACS:
 9743  9744  9745 -84 -9746 0
 9743  9744  9745 -84 -9747 0
 9743  9744  9745 -84  9748 0

c  1+1 --> 2
c    (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0 ∧  p_84) -> (-b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0)
c  in CNF:
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_2
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨  b^{7, 13}_1
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ -p_84 ∨ -b^{7, 13}_0
c  in DIMACS:
 9743  9744 -9745 -84 -9746 0
 9743  9744 -9745 -84  9747 0
 9743  9744 -9745 -84 -9748 0

c  2+1 --> break 
c    (-b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧  p_84) -> break
c  in CNF:
c     b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 9743 -9744  9745 -84 1162 0


c  2-1 --> 1
c    (-b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧ -p_84) -> (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0)
c  in CNF:
c     b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_2
c     b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_1
c     b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨  b^{7, 13}_0
c  in DIMACS:
 9743 -9744  9745  84 -9746 0
 9743 -9744  9745  84 -9747 0
 9743 -9744  9745  84  9748 0

c  1-1 --> 0
c    (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0 ∧ -p_84) -> (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧ -b^{7, 13}_0)
c  in CNF:
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_2
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_1
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_0
c  in DIMACS:
 9743  9744 -9745  84 -9746 0
 9743  9744 -9745  84 -9747 0
 9743  9744 -9745  84 -9748 0

c  0-1 --> -1
c    (-b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧ -p_84) -> ( b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0)
c  in CNF:
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨  b^{7, 13}_2
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_1
c     b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨  b^{7, 13}_0
c  in DIMACS:
 9743  9744  9745  84  9746 0
 9743  9744  9745  84 -9747 0
 9743  9744  9745  84  9748 0

c  -1-1 --> -2
c    ( b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧  b^{7, 12}_0 ∧ -p_84) -> ( b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0)
c  in CNF:
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨  b^{7, 13}_2
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨  b^{7, 13}_1
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨  p_84 ∨ -b^{7, 13}_0
c  in DIMACS:
-9743  9744 -9745  84  9746 0
-9743  9744 -9745  84  9747 0
-9743  9744 -9745  84 -9748 0

c  -2-1 --> break 
c    ( b^{7, 12}_2 ∧  b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨  b^{7, 12}_0 ∨  p_84 ∨ break
c  in DIMACS:
-9743 -9744  9745  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 12}_2 ∧ -b^{7, 12}_1 ∧ -b^{7, 12}_0 ∧ true) 
c  in CNF:
c    -b^{7, 12}_2 ∨  b^{7, 12}_1 ∨  b^{7, 12}_0 ∨ false 
c  in DIMACS:
-9743  9744  9745  0

c  3 does not represent an automaton state.
c    -(-b^{7, 12}_2 ∧  b^{7, 12}_1 ∧  b^{7, 12}_0 ∧ true) 
c  in CNF:
c     b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ false 
c  in DIMACS:
 9743 -9744 -9745  0
c  -3 does not represent an automaton state.
c    -( b^{7, 12}_2 ∧  b^{7, 12}_1 ∧  b^{7, 12}_0 ∧ true) 
c  in CNF:
c    -b^{7, 12}_2 ∨ -b^{7, 12}_1 ∨ -b^{7, 12}_0 ∨ false 
c  in DIMACS:
-9743 -9744 -9745  0

c i = 13
c  -2+1 --> -1
c    ( b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧  p_91) -> ( b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0)
c  in CNF:
c    -b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨  b^{7, 14}_2
c    -b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_1
c    -b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨  b^{7, 14}_0
c  in DIMACS:
-9746 -9747  9748 -91  9749 0
-9746 -9747  9748 -91 -9750 0
-9746 -9747  9748 -91  9751 0

c  -1+1 --> 0
c    ( b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0 ∧  p_91) -> (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧ -b^{7, 14}_0)
c  in CNF:
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_2
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_1
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_0
c  in DIMACS:
-9746  9747 -9748 -91 -9749 0
-9746  9747 -9748 -91 -9750 0
-9746  9747 -9748 -91 -9751 0

c  0+1 --> 1
c    (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧  p_91) -> (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0)
c  in CNF:
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_2
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_1
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨  b^{7, 14}_0
c  in DIMACS:
 9746  9747  9748 -91 -9749 0
 9746  9747  9748 -91 -9750 0
 9746  9747  9748 -91  9751 0

c  1+1 --> 2
c    (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0 ∧  p_91) -> (-b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0)
c  in CNF:
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_2
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨  b^{7, 14}_1
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ -p_91 ∨ -b^{7, 14}_0
c  in DIMACS:
 9746  9747 -9748 -91 -9749 0
 9746  9747 -9748 -91  9750 0
 9746  9747 -9748 -91 -9751 0

c  2+1 --> break 
c    (-b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧  p_91) -> break
c  in CNF:
c     b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ -p_91 ∨ break
c  in DIMACS:
 9746 -9747  9748 -91 1162 0


c  2-1 --> 1
c    (-b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧ -p_91) -> (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0)
c  in CNF:
c     b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_2
c     b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_1
c     b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨  b^{7, 14}_0
c  in DIMACS:
 9746 -9747  9748  91 -9749 0
 9746 -9747  9748  91 -9750 0
 9746 -9747  9748  91  9751 0

c  1-1 --> 0
c    (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0 ∧ -p_91) -> (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧ -b^{7, 14}_0)
c  in CNF:
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_2
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_1
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_0
c  in DIMACS:
 9746  9747 -9748  91 -9749 0
 9746  9747 -9748  91 -9750 0
 9746  9747 -9748  91 -9751 0

c  0-1 --> -1
c    (-b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧ -p_91) -> ( b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0)
c  in CNF:
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨  b^{7, 14}_2
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_1
c     b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨  b^{7, 14}_0
c  in DIMACS:
 9746  9747  9748  91  9749 0
 9746  9747  9748  91 -9750 0
 9746  9747  9748  91  9751 0

c  -1-1 --> -2
c    ( b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧  b^{7, 13}_0 ∧ -p_91) -> ( b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0)
c  in CNF:
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨  b^{7, 14}_2
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨  b^{7, 14}_1
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨  p_91 ∨ -b^{7, 14}_0
c  in DIMACS:
-9746  9747 -9748  91  9749 0
-9746  9747 -9748  91  9750 0
-9746  9747 -9748  91 -9751 0

c  -2-1 --> break 
c    ( b^{7, 13}_2 ∧  b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧ -p_91) -> break
c  in CNF:
c    -b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨  b^{7, 13}_0 ∨  p_91 ∨ break
c  in DIMACS:
-9746 -9747  9748  91 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 13}_2 ∧ -b^{7, 13}_1 ∧ -b^{7, 13}_0 ∧ true) 
c  in CNF:
c    -b^{7, 13}_2 ∨  b^{7, 13}_1 ∨  b^{7, 13}_0 ∨ false 
c  in DIMACS:
-9746  9747  9748  0

c  3 does not represent an automaton state.
c    -(-b^{7, 13}_2 ∧  b^{7, 13}_1 ∧  b^{7, 13}_0 ∧ true) 
c  in CNF:
c     b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ false 
c  in DIMACS:
 9746 -9747 -9748  0
c  -3 does not represent an automaton state.
c    -( b^{7, 13}_2 ∧  b^{7, 13}_1 ∧  b^{7, 13}_0 ∧ true) 
c  in CNF:
c    -b^{7, 13}_2 ∨ -b^{7, 13}_1 ∨ -b^{7, 13}_0 ∨ false 
c  in DIMACS:
-9746 -9747 -9748  0

c i = 14
c  -2+1 --> -1
c    ( b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧  p_98) -> ( b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0)
c  in CNF:
c    -b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨  b^{7, 15}_2
c    -b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_1
c    -b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨  b^{7, 15}_0
c  in DIMACS:
-9749 -9750  9751 -98  9752 0
-9749 -9750  9751 -98 -9753 0
-9749 -9750  9751 -98  9754 0

c  -1+1 --> 0
c    ( b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0 ∧  p_98) -> (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧ -b^{7, 15}_0)
c  in CNF:
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_2
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_1
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_0
c  in DIMACS:
-9749  9750 -9751 -98 -9752 0
-9749  9750 -9751 -98 -9753 0
-9749  9750 -9751 -98 -9754 0

c  0+1 --> 1
c    (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧  p_98) -> (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0)
c  in CNF:
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_2
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_1
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨  b^{7, 15}_0
c  in DIMACS:
 9749  9750  9751 -98 -9752 0
 9749  9750  9751 -98 -9753 0
 9749  9750  9751 -98  9754 0

c  1+1 --> 2
c    (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0 ∧  p_98) -> (-b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0)
c  in CNF:
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_2
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨  b^{7, 15}_1
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ -p_98 ∨ -b^{7, 15}_0
c  in DIMACS:
 9749  9750 -9751 -98 -9752 0
 9749  9750 -9751 -98  9753 0
 9749  9750 -9751 -98 -9754 0

c  2+1 --> break 
c    (-b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧  p_98) -> break
c  in CNF:
c     b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 9749 -9750  9751 -98 1162 0


c  2-1 --> 1
c    (-b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧ -p_98) -> (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0)
c  in CNF:
c     b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_2
c     b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_1
c     b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨  b^{7, 15}_0
c  in DIMACS:
 9749 -9750  9751  98 -9752 0
 9749 -9750  9751  98 -9753 0
 9749 -9750  9751  98  9754 0

c  1-1 --> 0
c    (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0 ∧ -p_98) -> (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧ -b^{7, 15}_0)
c  in CNF:
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_2
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_1
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_0
c  in DIMACS:
 9749  9750 -9751  98 -9752 0
 9749  9750 -9751  98 -9753 0
 9749  9750 -9751  98 -9754 0

c  0-1 --> -1
c    (-b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧ -p_98) -> ( b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0)
c  in CNF:
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨  b^{7, 15}_2
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_1
c     b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨  b^{7, 15}_0
c  in DIMACS:
 9749  9750  9751  98  9752 0
 9749  9750  9751  98 -9753 0
 9749  9750  9751  98  9754 0

c  -1-1 --> -2
c    ( b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧  b^{7, 14}_0 ∧ -p_98) -> ( b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0)
c  in CNF:
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨  b^{7, 15}_2
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨  b^{7, 15}_1
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨  p_98 ∨ -b^{7, 15}_0
c  in DIMACS:
-9749  9750 -9751  98  9752 0
-9749  9750 -9751  98  9753 0
-9749  9750 -9751  98 -9754 0

c  -2-1 --> break 
c    ( b^{7, 14}_2 ∧  b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨  b^{7, 14}_0 ∨  p_98 ∨ break
c  in DIMACS:
-9749 -9750  9751  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 14}_2 ∧ -b^{7, 14}_1 ∧ -b^{7, 14}_0 ∧ true) 
c  in CNF:
c    -b^{7, 14}_2 ∨  b^{7, 14}_1 ∨  b^{7, 14}_0 ∨ false 
c  in DIMACS:
-9749  9750  9751  0

c  3 does not represent an automaton state.
c    -(-b^{7, 14}_2 ∧  b^{7, 14}_1 ∧  b^{7, 14}_0 ∧ true) 
c  in CNF:
c     b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ false 
c  in DIMACS:
 9749 -9750 -9751  0
c  -3 does not represent an automaton state.
c    -( b^{7, 14}_2 ∧  b^{7, 14}_1 ∧  b^{7, 14}_0 ∧ true) 
c  in CNF:
c    -b^{7, 14}_2 ∨ -b^{7, 14}_1 ∨ -b^{7, 14}_0 ∨ false 
c  in DIMACS:
-9749 -9750 -9751  0

c i = 15
c  -2+1 --> -1
c    ( b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧  p_105) -> ( b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0)
c  in CNF:
c    -b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨  b^{7, 16}_2
c    -b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_1
c    -b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨  b^{7, 16}_0
c  in DIMACS:
-9752 -9753  9754 -105  9755 0
-9752 -9753  9754 -105 -9756 0
-9752 -9753  9754 -105  9757 0

c  -1+1 --> 0
c    ( b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0 ∧  p_105) -> (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧ -b^{7, 16}_0)
c  in CNF:
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_2
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_1
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_0
c  in DIMACS:
-9752  9753 -9754 -105 -9755 0
-9752  9753 -9754 -105 -9756 0
-9752  9753 -9754 -105 -9757 0

c  0+1 --> 1
c    (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧  p_105) -> (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0)
c  in CNF:
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_2
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_1
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨  b^{7, 16}_0
c  in DIMACS:
 9752  9753  9754 -105 -9755 0
 9752  9753  9754 -105 -9756 0
 9752  9753  9754 -105  9757 0

c  1+1 --> 2
c    (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0 ∧  p_105) -> (-b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0)
c  in CNF:
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_2
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨  b^{7, 16}_1
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ -p_105 ∨ -b^{7, 16}_0
c  in DIMACS:
 9752  9753 -9754 -105 -9755 0
 9752  9753 -9754 -105  9756 0
 9752  9753 -9754 -105 -9757 0

c  2+1 --> break 
c    (-b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧  p_105) -> break
c  in CNF:
c     b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 9752 -9753  9754 -105 1162 0


c  2-1 --> 1
c    (-b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧ -p_105) -> (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0)
c  in CNF:
c     b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_2
c     b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_1
c     b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨  b^{7, 16}_0
c  in DIMACS:
 9752 -9753  9754  105 -9755 0
 9752 -9753  9754  105 -9756 0
 9752 -9753  9754  105  9757 0

c  1-1 --> 0
c    (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0 ∧ -p_105) -> (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧ -b^{7, 16}_0)
c  in CNF:
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_2
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_1
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_0
c  in DIMACS:
 9752  9753 -9754  105 -9755 0
 9752  9753 -9754  105 -9756 0
 9752  9753 -9754  105 -9757 0

c  0-1 --> -1
c    (-b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧ -p_105) -> ( b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0)
c  in CNF:
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨  b^{7, 16}_2
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_1
c     b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨  b^{7, 16}_0
c  in DIMACS:
 9752  9753  9754  105  9755 0
 9752  9753  9754  105 -9756 0
 9752  9753  9754  105  9757 0

c  -1-1 --> -2
c    ( b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧  b^{7, 15}_0 ∧ -p_105) -> ( b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0)
c  in CNF:
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨  b^{7, 16}_2
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨  b^{7, 16}_1
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨  p_105 ∨ -b^{7, 16}_0
c  in DIMACS:
-9752  9753 -9754  105  9755 0
-9752  9753 -9754  105  9756 0
-9752  9753 -9754  105 -9757 0

c  -2-1 --> break 
c    ( b^{7, 15}_2 ∧  b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨  b^{7, 15}_0 ∨  p_105 ∨ break
c  in DIMACS:
-9752 -9753  9754  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 15}_2 ∧ -b^{7, 15}_1 ∧ -b^{7, 15}_0 ∧ true) 
c  in CNF:
c    -b^{7, 15}_2 ∨  b^{7, 15}_1 ∨  b^{7, 15}_0 ∨ false 
c  in DIMACS:
-9752  9753  9754  0

c  3 does not represent an automaton state.
c    -(-b^{7, 15}_2 ∧  b^{7, 15}_1 ∧  b^{7, 15}_0 ∧ true) 
c  in CNF:
c     b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ false 
c  in DIMACS:
 9752 -9753 -9754  0
c  -3 does not represent an automaton state.
c    -( b^{7, 15}_2 ∧  b^{7, 15}_1 ∧  b^{7, 15}_0 ∧ true) 
c  in CNF:
c    -b^{7, 15}_2 ∨ -b^{7, 15}_1 ∨ -b^{7, 15}_0 ∨ false 
c  in DIMACS:
-9752 -9753 -9754  0

c i = 16
c  -2+1 --> -1
c    ( b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧  p_112) -> ( b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0)
c  in CNF:
c    -b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨  b^{7, 17}_2
c    -b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_1
c    -b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨  b^{7, 17}_0
c  in DIMACS:
-9755 -9756  9757 -112  9758 0
-9755 -9756  9757 -112 -9759 0
-9755 -9756  9757 -112  9760 0

c  -1+1 --> 0
c    ( b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0 ∧  p_112) -> (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧ -b^{7, 17}_0)
c  in CNF:
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_2
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_1
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_0
c  in DIMACS:
-9755  9756 -9757 -112 -9758 0
-9755  9756 -9757 -112 -9759 0
-9755  9756 -9757 -112 -9760 0

c  0+1 --> 1
c    (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧  p_112) -> (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0)
c  in CNF:
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_2
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_1
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨  b^{7, 17}_0
c  in DIMACS:
 9755  9756  9757 -112 -9758 0
 9755  9756  9757 -112 -9759 0
 9755  9756  9757 -112  9760 0

c  1+1 --> 2
c    (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0 ∧  p_112) -> (-b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0)
c  in CNF:
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_2
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨  b^{7, 17}_1
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ -p_112 ∨ -b^{7, 17}_0
c  in DIMACS:
 9755  9756 -9757 -112 -9758 0
 9755  9756 -9757 -112  9759 0
 9755  9756 -9757 -112 -9760 0

c  2+1 --> break 
c    (-b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧  p_112) -> break
c  in CNF:
c     b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 9755 -9756  9757 -112 1162 0


c  2-1 --> 1
c    (-b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧ -p_112) -> (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0)
c  in CNF:
c     b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_2
c     b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_1
c     b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨  b^{7, 17}_0
c  in DIMACS:
 9755 -9756  9757  112 -9758 0
 9755 -9756  9757  112 -9759 0
 9755 -9756  9757  112  9760 0

c  1-1 --> 0
c    (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0 ∧ -p_112) -> (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧ -b^{7, 17}_0)
c  in CNF:
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_2
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_1
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_0
c  in DIMACS:
 9755  9756 -9757  112 -9758 0
 9755  9756 -9757  112 -9759 0
 9755  9756 -9757  112 -9760 0

c  0-1 --> -1
c    (-b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧ -p_112) -> ( b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0)
c  in CNF:
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨  b^{7, 17}_2
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_1
c     b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨  b^{7, 17}_0
c  in DIMACS:
 9755  9756  9757  112  9758 0
 9755  9756  9757  112 -9759 0
 9755  9756  9757  112  9760 0

c  -1-1 --> -2
c    ( b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧  b^{7, 16}_0 ∧ -p_112) -> ( b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0)
c  in CNF:
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨  b^{7, 17}_2
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨  b^{7, 17}_1
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨  p_112 ∨ -b^{7, 17}_0
c  in DIMACS:
-9755  9756 -9757  112  9758 0
-9755  9756 -9757  112  9759 0
-9755  9756 -9757  112 -9760 0

c  -2-1 --> break 
c    ( b^{7, 16}_2 ∧  b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨  b^{7, 16}_0 ∨  p_112 ∨ break
c  in DIMACS:
-9755 -9756  9757  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 16}_2 ∧ -b^{7, 16}_1 ∧ -b^{7, 16}_0 ∧ true) 
c  in CNF:
c    -b^{7, 16}_2 ∨  b^{7, 16}_1 ∨  b^{7, 16}_0 ∨ false 
c  in DIMACS:
-9755  9756  9757  0

c  3 does not represent an automaton state.
c    -(-b^{7, 16}_2 ∧  b^{7, 16}_1 ∧  b^{7, 16}_0 ∧ true) 
c  in CNF:
c     b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ false 
c  in DIMACS:
 9755 -9756 -9757  0
c  -3 does not represent an automaton state.
c    -( b^{7, 16}_2 ∧  b^{7, 16}_1 ∧  b^{7, 16}_0 ∧ true) 
c  in CNF:
c    -b^{7, 16}_2 ∨ -b^{7, 16}_1 ∨ -b^{7, 16}_0 ∨ false 
c  in DIMACS:
-9755 -9756 -9757  0

c i = 17
c  -2+1 --> -1
c    ( b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧  p_119) -> ( b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0)
c  in CNF:
c    -b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨  b^{7, 18}_2
c    -b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_1
c    -b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨  b^{7, 18}_0
c  in DIMACS:
-9758 -9759  9760 -119  9761 0
-9758 -9759  9760 -119 -9762 0
-9758 -9759  9760 -119  9763 0

c  -1+1 --> 0
c    ( b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0 ∧  p_119) -> (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧ -b^{7, 18}_0)
c  in CNF:
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_2
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_1
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_0
c  in DIMACS:
-9758  9759 -9760 -119 -9761 0
-9758  9759 -9760 -119 -9762 0
-9758  9759 -9760 -119 -9763 0

c  0+1 --> 1
c    (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧  p_119) -> (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0)
c  in CNF:
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_2
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_1
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨  b^{7, 18}_0
c  in DIMACS:
 9758  9759  9760 -119 -9761 0
 9758  9759  9760 -119 -9762 0
 9758  9759  9760 -119  9763 0

c  1+1 --> 2
c    (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0 ∧  p_119) -> (-b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0)
c  in CNF:
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_2
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨  b^{7, 18}_1
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ -p_119 ∨ -b^{7, 18}_0
c  in DIMACS:
 9758  9759 -9760 -119 -9761 0
 9758  9759 -9760 -119  9762 0
 9758  9759 -9760 -119 -9763 0

c  2+1 --> break 
c    (-b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧  p_119) -> break
c  in CNF:
c     b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ -p_119 ∨ break
c  in DIMACS:
 9758 -9759  9760 -119 1162 0


c  2-1 --> 1
c    (-b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧ -p_119) -> (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0)
c  in CNF:
c     b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_2
c     b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_1
c     b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨  b^{7, 18}_0
c  in DIMACS:
 9758 -9759  9760  119 -9761 0
 9758 -9759  9760  119 -9762 0
 9758 -9759  9760  119  9763 0

c  1-1 --> 0
c    (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0 ∧ -p_119) -> (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧ -b^{7, 18}_0)
c  in CNF:
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_2
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_1
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_0
c  in DIMACS:
 9758  9759 -9760  119 -9761 0
 9758  9759 -9760  119 -9762 0
 9758  9759 -9760  119 -9763 0

c  0-1 --> -1
c    (-b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧ -p_119) -> ( b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0)
c  in CNF:
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨  b^{7, 18}_2
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_1
c     b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨  b^{7, 18}_0
c  in DIMACS:
 9758  9759  9760  119  9761 0
 9758  9759  9760  119 -9762 0
 9758  9759  9760  119  9763 0

c  -1-1 --> -2
c    ( b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧  b^{7, 17}_0 ∧ -p_119) -> ( b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0)
c  in CNF:
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨  b^{7, 18}_2
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨  b^{7, 18}_1
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨  p_119 ∨ -b^{7, 18}_0
c  in DIMACS:
-9758  9759 -9760  119  9761 0
-9758  9759 -9760  119  9762 0
-9758  9759 -9760  119 -9763 0

c  -2-1 --> break 
c    ( b^{7, 17}_2 ∧  b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧ -p_119) -> break
c  in CNF:
c    -b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨  b^{7, 17}_0 ∨  p_119 ∨ break
c  in DIMACS:
-9758 -9759  9760  119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 17}_2 ∧ -b^{7, 17}_1 ∧ -b^{7, 17}_0 ∧ true) 
c  in CNF:
c    -b^{7, 17}_2 ∨  b^{7, 17}_1 ∨  b^{7, 17}_0 ∨ false 
c  in DIMACS:
-9758  9759  9760  0

c  3 does not represent an automaton state.
c    -(-b^{7, 17}_2 ∧  b^{7, 17}_1 ∧  b^{7, 17}_0 ∧ true) 
c  in CNF:
c     b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ false 
c  in DIMACS:
 9758 -9759 -9760  0
c  -3 does not represent an automaton state.
c    -( b^{7, 17}_2 ∧  b^{7, 17}_1 ∧  b^{7, 17}_0 ∧ true) 
c  in CNF:
c    -b^{7, 17}_2 ∨ -b^{7, 17}_1 ∨ -b^{7, 17}_0 ∨ false 
c  in DIMACS:
-9758 -9759 -9760  0

c i = 18
c  -2+1 --> -1
c    ( b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧  p_126) -> ( b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0)
c  in CNF:
c    -b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨  b^{7, 19}_2
c    -b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_1
c    -b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨  b^{7, 19}_0
c  in DIMACS:
-9761 -9762  9763 -126  9764 0
-9761 -9762  9763 -126 -9765 0
-9761 -9762  9763 -126  9766 0

c  -1+1 --> 0
c    ( b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0 ∧  p_126) -> (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧ -b^{7, 19}_0)
c  in CNF:
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_2
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_1
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_0
c  in DIMACS:
-9761  9762 -9763 -126 -9764 0
-9761  9762 -9763 -126 -9765 0
-9761  9762 -9763 -126 -9766 0

c  0+1 --> 1
c    (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧  p_126) -> (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0)
c  in CNF:
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_2
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_1
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨  b^{7, 19}_0
c  in DIMACS:
 9761  9762  9763 -126 -9764 0
 9761  9762  9763 -126 -9765 0
 9761  9762  9763 -126  9766 0

c  1+1 --> 2
c    (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0 ∧  p_126) -> (-b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0)
c  in CNF:
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_2
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨  b^{7, 19}_1
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ -p_126 ∨ -b^{7, 19}_0
c  in DIMACS:
 9761  9762 -9763 -126 -9764 0
 9761  9762 -9763 -126  9765 0
 9761  9762 -9763 -126 -9766 0

c  2+1 --> break 
c    (-b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧  p_126) -> break
c  in CNF:
c     b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 9761 -9762  9763 -126 1162 0


c  2-1 --> 1
c    (-b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧ -p_126) -> (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0)
c  in CNF:
c     b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_2
c     b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_1
c     b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨  b^{7, 19}_0
c  in DIMACS:
 9761 -9762  9763  126 -9764 0
 9761 -9762  9763  126 -9765 0
 9761 -9762  9763  126  9766 0

c  1-1 --> 0
c    (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0 ∧ -p_126) -> (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧ -b^{7, 19}_0)
c  in CNF:
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_2
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_1
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_0
c  in DIMACS:
 9761  9762 -9763  126 -9764 0
 9761  9762 -9763  126 -9765 0
 9761  9762 -9763  126 -9766 0

c  0-1 --> -1
c    (-b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧ -p_126) -> ( b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0)
c  in CNF:
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨  b^{7, 19}_2
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_1
c     b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨  b^{7, 19}_0
c  in DIMACS:
 9761  9762  9763  126  9764 0
 9761  9762  9763  126 -9765 0
 9761  9762  9763  126  9766 0

c  -1-1 --> -2
c    ( b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧  b^{7, 18}_0 ∧ -p_126) -> ( b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0)
c  in CNF:
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨  b^{7, 19}_2
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨  b^{7, 19}_1
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨  p_126 ∨ -b^{7, 19}_0
c  in DIMACS:
-9761  9762 -9763  126  9764 0
-9761  9762 -9763  126  9765 0
-9761  9762 -9763  126 -9766 0

c  -2-1 --> break 
c    ( b^{7, 18}_2 ∧  b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨  b^{7, 18}_0 ∨  p_126 ∨ break
c  in DIMACS:
-9761 -9762  9763  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 18}_2 ∧ -b^{7, 18}_1 ∧ -b^{7, 18}_0 ∧ true) 
c  in CNF:
c    -b^{7, 18}_2 ∨  b^{7, 18}_1 ∨  b^{7, 18}_0 ∨ false 
c  in DIMACS:
-9761  9762  9763  0

c  3 does not represent an automaton state.
c    -(-b^{7, 18}_2 ∧  b^{7, 18}_1 ∧  b^{7, 18}_0 ∧ true) 
c  in CNF:
c     b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ false 
c  in DIMACS:
 9761 -9762 -9763  0
c  -3 does not represent an automaton state.
c    -( b^{7, 18}_2 ∧  b^{7, 18}_1 ∧  b^{7, 18}_0 ∧ true) 
c  in CNF:
c    -b^{7, 18}_2 ∨ -b^{7, 18}_1 ∨ -b^{7, 18}_0 ∨ false 
c  in DIMACS:
-9761 -9762 -9763  0

c i = 19
c  -2+1 --> -1
c    ( b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧  p_133) -> ( b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0)
c  in CNF:
c    -b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨  b^{7, 20}_2
c    -b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_1
c    -b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨  b^{7, 20}_0
c  in DIMACS:
-9764 -9765  9766 -133  9767 0
-9764 -9765  9766 -133 -9768 0
-9764 -9765  9766 -133  9769 0

c  -1+1 --> 0
c    ( b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0 ∧  p_133) -> (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧ -b^{7, 20}_0)
c  in CNF:
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_2
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_1
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_0
c  in DIMACS:
-9764  9765 -9766 -133 -9767 0
-9764  9765 -9766 -133 -9768 0
-9764  9765 -9766 -133 -9769 0

c  0+1 --> 1
c    (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧  p_133) -> (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0)
c  in CNF:
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_2
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_1
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨  b^{7, 20}_0
c  in DIMACS:
 9764  9765  9766 -133 -9767 0
 9764  9765  9766 -133 -9768 0
 9764  9765  9766 -133  9769 0

c  1+1 --> 2
c    (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0 ∧  p_133) -> (-b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0)
c  in CNF:
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_2
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨  b^{7, 20}_1
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ -p_133 ∨ -b^{7, 20}_0
c  in DIMACS:
 9764  9765 -9766 -133 -9767 0
 9764  9765 -9766 -133  9768 0
 9764  9765 -9766 -133 -9769 0

c  2+1 --> break 
c    (-b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧  p_133) -> break
c  in CNF:
c     b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ -p_133 ∨ break
c  in DIMACS:
 9764 -9765  9766 -133 1162 0


c  2-1 --> 1
c    (-b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧ -p_133) -> (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0)
c  in CNF:
c     b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_2
c     b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_1
c     b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨  b^{7, 20}_0
c  in DIMACS:
 9764 -9765  9766  133 -9767 0
 9764 -9765  9766  133 -9768 0
 9764 -9765  9766  133  9769 0

c  1-1 --> 0
c    (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0 ∧ -p_133) -> (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧ -b^{7, 20}_0)
c  in CNF:
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_2
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_1
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_0
c  in DIMACS:
 9764  9765 -9766  133 -9767 0
 9764  9765 -9766  133 -9768 0
 9764  9765 -9766  133 -9769 0

c  0-1 --> -1
c    (-b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧ -p_133) -> ( b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0)
c  in CNF:
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨  b^{7, 20}_2
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_1
c     b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨  b^{7, 20}_0
c  in DIMACS:
 9764  9765  9766  133  9767 0
 9764  9765  9766  133 -9768 0
 9764  9765  9766  133  9769 0

c  -1-1 --> -2
c    ( b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧  b^{7, 19}_0 ∧ -p_133) -> ( b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0)
c  in CNF:
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨  b^{7, 20}_2
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨  b^{7, 20}_1
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨  p_133 ∨ -b^{7, 20}_0
c  in DIMACS:
-9764  9765 -9766  133  9767 0
-9764  9765 -9766  133  9768 0
-9764  9765 -9766  133 -9769 0

c  -2-1 --> break 
c    ( b^{7, 19}_2 ∧  b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧ -p_133) -> break
c  in CNF:
c    -b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨  b^{7, 19}_0 ∨  p_133 ∨ break
c  in DIMACS:
-9764 -9765  9766  133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 19}_2 ∧ -b^{7, 19}_1 ∧ -b^{7, 19}_0 ∧ true) 
c  in CNF:
c    -b^{7, 19}_2 ∨  b^{7, 19}_1 ∨  b^{7, 19}_0 ∨ false 
c  in DIMACS:
-9764  9765  9766  0

c  3 does not represent an automaton state.
c    -(-b^{7, 19}_2 ∧  b^{7, 19}_1 ∧  b^{7, 19}_0 ∧ true) 
c  in CNF:
c     b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ false 
c  in DIMACS:
 9764 -9765 -9766  0
c  -3 does not represent an automaton state.
c    -( b^{7, 19}_2 ∧  b^{7, 19}_1 ∧  b^{7, 19}_0 ∧ true) 
c  in CNF:
c    -b^{7, 19}_2 ∨ -b^{7, 19}_1 ∨ -b^{7, 19}_0 ∨ false 
c  in DIMACS:
-9764 -9765 -9766  0

c i = 20
c  -2+1 --> -1
c    ( b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧  p_140) -> ( b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0)
c  in CNF:
c    -b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨  b^{7, 21}_2
c    -b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_1
c    -b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨  b^{7, 21}_0
c  in DIMACS:
-9767 -9768  9769 -140  9770 0
-9767 -9768  9769 -140 -9771 0
-9767 -9768  9769 -140  9772 0

c  -1+1 --> 0
c    ( b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0 ∧  p_140) -> (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧ -b^{7, 21}_0)
c  in CNF:
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_2
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_1
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_0
c  in DIMACS:
-9767  9768 -9769 -140 -9770 0
-9767  9768 -9769 -140 -9771 0
-9767  9768 -9769 -140 -9772 0

c  0+1 --> 1
c    (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧  p_140) -> (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0)
c  in CNF:
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_2
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_1
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨  b^{7, 21}_0
c  in DIMACS:
 9767  9768  9769 -140 -9770 0
 9767  9768  9769 -140 -9771 0
 9767  9768  9769 -140  9772 0

c  1+1 --> 2
c    (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0 ∧  p_140) -> (-b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0)
c  in CNF:
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_2
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨  b^{7, 21}_1
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ -p_140 ∨ -b^{7, 21}_0
c  in DIMACS:
 9767  9768 -9769 -140 -9770 0
 9767  9768 -9769 -140  9771 0
 9767  9768 -9769 -140 -9772 0

c  2+1 --> break 
c    (-b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧  p_140) -> break
c  in CNF:
c     b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 9767 -9768  9769 -140 1162 0


c  2-1 --> 1
c    (-b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧ -p_140) -> (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0)
c  in CNF:
c     b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_2
c     b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_1
c     b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨  b^{7, 21}_0
c  in DIMACS:
 9767 -9768  9769  140 -9770 0
 9767 -9768  9769  140 -9771 0
 9767 -9768  9769  140  9772 0

c  1-1 --> 0
c    (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0 ∧ -p_140) -> (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧ -b^{7, 21}_0)
c  in CNF:
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_2
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_1
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_0
c  in DIMACS:
 9767  9768 -9769  140 -9770 0
 9767  9768 -9769  140 -9771 0
 9767  9768 -9769  140 -9772 0

c  0-1 --> -1
c    (-b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧ -p_140) -> ( b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0)
c  in CNF:
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨  b^{7, 21}_2
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_1
c     b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨  b^{7, 21}_0
c  in DIMACS:
 9767  9768  9769  140  9770 0
 9767  9768  9769  140 -9771 0
 9767  9768  9769  140  9772 0

c  -1-1 --> -2
c    ( b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧  b^{7, 20}_0 ∧ -p_140) -> ( b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0)
c  in CNF:
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨  b^{7, 21}_2
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨  b^{7, 21}_1
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨  p_140 ∨ -b^{7, 21}_0
c  in DIMACS:
-9767  9768 -9769  140  9770 0
-9767  9768 -9769  140  9771 0
-9767  9768 -9769  140 -9772 0

c  -2-1 --> break 
c    ( b^{7, 20}_2 ∧  b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨  b^{7, 20}_0 ∨  p_140 ∨ break
c  in DIMACS:
-9767 -9768  9769  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 20}_2 ∧ -b^{7, 20}_1 ∧ -b^{7, 20}_0 ∧ true) 
c  in CNF:
c    -b^{7, 20}_2 ∨  b^{7, 20}_1 ∨  b^{7, 20}_0 ∨ false 
c  in DIMACS:
-9767  9768  9769  0

c  3 does not represent an automaton state.
c    -(-b^{7, 20}_2 ∧  b^{7, 20}_1 ∧  b^{7, 20}_0 ∧ true) 
c  in CNF:
c     b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ false 
c  in DIMACS:
 9767 -9768 -9769  0
c  -3 does not represent an automaton state.
c    -( b^{7, 20}_2 ∧  b^{7, 20}_1 ∧  b^{7, 20}_0 ∧ true) 
c  in CNF:
c    -b^{7, 20}_2 ∨ -b^{7, 20}_1 ∨ -b^{7, 20}_0 ∨ false 
c  in DIMACS:
-9767 -9768 -9769  0

c i = 21
c  -2+1 --> -1
c    ( b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧  p_147) -> ( b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0)
c  in CNF:
c    -b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨  b^{7, 22}_2
c    -b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_1
c    -b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨  b^{7, 22}_0
c  in DIMACS:
-9770 -9771  9772 -147  9773 0
-9770 -9771  9772 -147 -9774 0
-9770 -9771  9772 -147  9775 0

c  -1+1 --> 0
c    ( b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0 ∧  p_147) -> (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧ -b^{7, 22}_0)
c  in CNF:
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_2
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_1
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_0
c  in DIMACS:
-9770  9771 -9772 -147 -9773 0
-9770  9771 -9772 -147 -9774 0
-9770  9771 -9772 -147 -9775 0

c  0+1 --> 1
c    (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧  p_147) -> (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0)
c  in CNF:
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_2
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_1
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨  b^{7, 22}_0
c  in DIMACS:
 9770  9771  9772 -147 -9773 0
 9770  9771  9772 -147 -9774 0
 9770  9771  9772 -147  9775 0

c  1+1 --> 2
c    (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0 ∧  p_147) -> (-b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0)
c  in CNF:
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_2
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨  b^{7, 22}_1
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ -p_147 ∨ -b^{7, 22}_0
c  in DIMACS:
 9770  9771 -9772 -147 -9773 0
 9770  9771 -9772 -147  9774 0
 9770  9771 -9772 -147 -9775 0

c  2+1 --> break 
c    (-b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧  p_147) -> break
c  in CNF:
c     b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 9770 -9771  9772 -147 1162 0


c  2-1 --> 1
c    (-b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧ -p_147) -> (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0)
c  in CNF:
c     b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_2
c     b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_1
c     b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨  b^{7, 22}_0
c  in DIMACS:
 9770 -9771  9772  147 -9773 0
 9770 -9771  9772  147 -9774 0
 9770 -9771  9772  147  9775 0

c  1-1 --> 0
c    (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0 ∧ -p_147) -> (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧ -b^{7, 22}_0)
c  in CNF:
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_2
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_1
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_0
c  in DIMACS:
 9770  9771 -9772  147 -9773 0
 9770  9771 -9772  147 -9774 0
 9770  9771 -9772  147 -9775 0

c  0-1 --> -1
c    (-b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧ -p_147) -> ( b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0)
c  in CNF:
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨  b^{7, 22}_2
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_1
c     b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨  b^{7, 22}_0
c  in DIMACS:
 9770  9771  9772  147  9773 0
 9770  9771  9772  147 -9774 0
 9770  9771  9772  147  9775 0

c  -1-1 --> -2
c    ( b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧  b^{7, 21}_0 ∧ -p_147) -> ( b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0)
c  in CNF:
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨  b^{7, 22}_2
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨  b^{7, 22}_1
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨  p_147 ∨ -b^{7, 22}_0
c  in DIMACS:
-9770  9771 -9772  147  9773 0
-9770  9771 -9772  147  9774 0
-9770  9771 -9772  147 -9775 0

c  -2-1 --> break 
c    ( b^{7, 21}_2 ∧  b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨  b^{7, 21}_0 ∨  p_147 ∨ break
c  in DIMACS:
-9770 -9771  9772  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 21}_2 ∧ -b^{7, 21}_1 ∧ -b^{7, 21}_0 ∧ true) 
c  in CNF:
c    -b^{7, 21}_2 ∨  b^{7, 21}_1 ∨  b^{7, 21}_0 ∨ false 
c  in DIMACS:
-9770  9771  9772  0

c  3 does not represent an automaton state.
c    -(-b^{7, 21}_2 ∧  b^{7, 21}_1 ∧  b^{7, 21}_0 ∧ true) 
c  in CNF:
c     b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ false 
c  in DIMACS:
 9770 -9771 -9772  0
c  -3 does not represent an automaton state.
c    -( b^{7, 21}_2 ∧  b^{7, 21}_1 ∧  b^{7, 21}_0 ∧ true) 
c  in CNF:
c    -b^{7, 21}_2 ∨ -b^{7, 21}_1 ∨ -b^{7, 21}_0 ∨ false 
c  in DIMACS:
-9770 -9771 -9772  0

c i = 22
c  -2+1 --> -1
c    ( b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧  p_154) -> ( b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0)
c  in CNF:
c    -b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨  b^{7, 23}_2
c    -b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_1
c    -b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨  b^{7, 23}_0
c  in DIMACS:
-9773 -9774  9775 -154  9776 0
-9773 -9774  9775 -154 -9777 0
-9773 -9774  9775 -154  9778 0

c  -1+1 --> 0
c    ( b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0 ∧  p_154) -> (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧ -b^{7, 23}_0)
c  in CNF:
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_2
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_1
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_0
c  in DIMACS:
-9773  9774 -9775 -154 -9776 0
-9773  9774 -9775 -154 -9777 0
-9773  9774 -9775 -154 -9778 0

c  0+1 --> 1
c    (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧  p_154) -> (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0)
c  in CNF:
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_2
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_1
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨  b^{7, 23}_0
c  in DIMACS:
 9773  9774  9775 -154 -9776 0
 9773  9774  9775 -154 -9777 0
 9773  9774  9775 -154  9778 0

c  1+1 --> 2
c    (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0 ∧  p_154) -> (-b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0)
c  in CNF:
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_2
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨  b^{7, 23}_1
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ -p_154 ∨ -b^{7, 23}_0
c  in DIMACS:
 9773  9774 -9775 -154 -9776 0
 9773  9774 -9775 -154  9777 0
 9773  9774 -9775 -154 -9778 0

c  2+1 --> break 
c    (-b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧  p_154) -> break
c  in CNF:
c     b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 9773 -9774  9775 -154 1162 0


c  2-1 --> 1
c    (-b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧ -p_154) -> (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0)
c  in CNF:
c     b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_2
c     b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_1
c     b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨  b^{7, 23}_0
c  in DIMACS:
 9773 -9774  9775  154 -9776 0
 9773 -9774  9775  154 -9777 0
 9773 -9774  9775  154  9778 0

c  1-1 --> 0
c    (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0 ∧ -p_154) -> (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧ -b^{7, 23}_0)
c  in CNF:
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_2
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_1
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_0
c  in DIMACS:
 9773  9774 -9775  154 -9776 0
 9773  9774 -9775  154 -9777 0
 9773  9774 -9775  154 -9778 0

c  0-1 --> -1
c    (-b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧ -p_154) -> ( b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0)
c  in CNF:
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨  b^{7, 23}_2
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_1
c     b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨  b^{7, 23}_0
c  in DIMACS:
 9773  9774  9775  154  9776 0
 9773  9774  9775  154 -9777 0
 9773  9774  9775  154  9778 0

c  -1-1 --> -2
c    ( b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧  b^{7, 22}_0 ∧ -p_154) -> ( b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0)
c  in CNF:
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨  b^{7, 23}_2
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨  b^{7, 23}_1
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨  p_154 ∨ -b^{7, 23}_0
c  in DIMACS:
-9773  9774 -9775  154  9776 0
-9773  9774 -9775  154  9777 0
-9773  9774 -9775  154 -9778 0

c  -2-1 --> break 
c    ( b^{7, 22}_2 ∧  b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨  b^{7, 22}_0 ∨  p_154 ∨ break
c  in DIMACS:
-9773 -9774  9775  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 22}_2 ∧ -b^{7, 22}_1 ∧ -b^{7, 22}_0 ∧ true) 
c  in CNF:
c    -b^{7, 22}_2 ∨  b^{7, 22}_1 ∨  b^{7, 22}_0 ∨ false 
c  in DIMACS:
-9773  9774  9775  0

c  3 does not represent an automaton state.
c    -(-b^{7, 22}_2 ∧  b^{7, 22}_1 ∧  b^{7, 22}_0 ∧ true) 
c  in CNF:
c     b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ false 
c  in DIMACS:
 9773 -9774 -9775  0
c  -3 does not represent an automaton state.
c    -( b^{7, 22}_2 ∧  b^{7, 22}_1 ∧  b^{7, 22}_0 ∧ true) 
c  in CNF:
c    -b^{7, 22}_2 ∨ -b^{7, 22}_1 ∨ -b^{7, 22}_0 ∨ false 
c  in DIMACS:
-9773 -9774 -9775  0

c i = 23
c  -2+1 --> -1
c    ( b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧  p_161) -> ( b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0)
c  in CNF:
c    -b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨  b^{7, 24}_2
c    -b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_1
c    -b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨  b^{7, 24}_0
c  in DIMACS:
-9776 -9777  9778 -161  9779 0
-9776 -9777  9778 -161 -9780 0
-9776 -9777  9778 -161  9781 0

c  -1+1 --> 0
c    ( b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0 ∧  p_161) -> (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧ -b^{7, 24}_0)
c  in CNF:
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_2
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_1
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_0
c  in DIMACS:
-9776  9777 -9778 -161 -9779 0
-9776  9777 -9778 -161 -9780 0
-9776  9777 -9778 -161 -9781 0

c  0+1 --> 1
c    (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧  p_161) -> (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0)
c  in CNF:
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_2
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_1
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨  b^{7, 24}_0
c  in DIMACS:
 9776  9777  9778 -161 -9779 0
 9776  9777  9778 -161 -9780 0
 9776  9777  9778 -161  9781 0

c  1+1 --> 2
c    (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0 ∧  p_161) -> (-b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0)
c  in CNF:
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_2
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨  b^{7, 24}_1
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ -p_161 ∨ -b^{7, 24}_0
c  in DIMACS:
 9776  9777 -9778 -161 -9779 0
 9776  9777 -9778 -161  9780 0
 9776  9777 -9778 -161 -9781 0

c  2+1 --> break 
c    (-b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧  p_161) -> break
c  in CNF:
c     b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ -p_161 ∨ break
c  in DIMACS:
 9776 -9777  9778 -161 1162 0


c  2-1 --> 1
c    (-b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧ -p_161) -> (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0)
c  in CNF:
c     b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_2
c     b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_1
c     b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨  b^{7, 24}_0
c  in DIMACS:
 9776 -9777  9778  161 -9779 0
 9776 -9777  9778  161 -9780 0
 9776 -9777  9778  161  9781 0

c  1-1 --> 0
c    (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0 ∧ -p_161) -> (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧ -b^{7, 24}_0)
c  in CNF:
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_2
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_1
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_0
c  in DIMACS:
 9776  9777 -9778  161 -9779 0
 9776  9777 -9778  161 -9780 0
 9776  9777 -9778  161 -9781 0

c  0-1 --> -1
c    (-b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧ -p_161) -> ( b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0)
c  in CNF:
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨  b^{7, 24}_2
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_1
c     b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨  b^{7, 24}_0
c  in DIMACS:
 9776  9777  9778  161  9779 0
 9776  9777  9778  161 -9780 0
 9776  9777  9778  161  9781 0

c  -1-1 --> -2
c    ( b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧  b^{7, 23}_0 ∧ -p_161) -> ( b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0)
c  in CNF:
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨  b^{7, 24}_2
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨  b^{7, 24}_1
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨  p_161 ∨ -b^{7, 24}_0
c  in DIMACS:
-9776  9777 -9778  161  9779 0
-9776  9777 -9778  161  9780 0
-9776  9777 -9778  161 -9781 0

c  -2-1 --> break 
c    ( b^{7, 23}_2 ∧  b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧ -p_161) -> break
c  in CNF:
c    -b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨  b^{7, 23}_0 ∨  p_161 ∨ break
c  in DIMACS:
-9776 -9777  9778  161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 23}_2 ∧ -b^{7, 23}_1 ∧ -b^{7, 23}_0 ∧ true) 
c  in CNF:
c    -b^{7, 23}_2 ∨  b^{7, 23}_1 ∨  b^{7, 23}_0 ∨ false 
c  in DIMACS:
-9776  9777  9778  0

c  3 does not represent an automaton state.
c    -(-b^{7, 23}_2 ∧  b^{7, 23}_1 ∧  b^{7, 23}_0 ∧ true) 
c  in CNF:
c     b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ false 
c  in DIMACS:
 9776 -9777 -9778  0
c  -3 does not represent an automaton state.
c    -( b^{7, 23}_2 ∧  b^{7, 23}_1 ∧  b^{7, 23}_0 ∧ true) 
c  in CNF:
c    -b^{7, 23}_2 ∨ -b^{7, 23}_1 ∨ -b^{7, 23}_0 ∨ false 
c  in DIMACS:
-9776 -9777 -9778  0

c i = 24
c  -2+1 --> -1
c    ( b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧  p_168) -> ( b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0)
c  in CNF:
c    -b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨  b^{7, 25}_2
c    -b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_1
c    -b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨  b^{7, 25}_0
c  in DIMACS:
-9779 -9780  9781 -168  9782 0
-9779 -9780  9781 -168 -9783 0
-9779 -9780  9781 -168  9784 0

c  -1+1 --> 0
c    ( b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0 ∧  p_168) -> (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧ -b^{7, 25}_0)
c  in CNF:
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_2
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_1
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_0
c  in DIMACS:
-9779  9780 -9781 -168 -9782 0
-9779  9780 -9781 -168 -9783 0
-9779  9780 -9781 -168 -9784 0

c  0+1 --> 1
c    (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧  p_168) -> (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0)
c  in CNF:
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_2
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_1
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨  b^{7, 25}_0
c  in DIMACS:
 9779  9780  9781 -168 -9782 0
 9779  9780  9781 -168 -9783 0
 9779  9780  9781 -168  9784 0

c  1+1 --> 2
c    (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0 ∧  p_168) -> (-b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0)
c  in CNF:
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_2
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨  b^{7, 25}_1
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ -p_168 ∨ -b^{7, 25}_0
c  in DIMACS:
 9779  9780 -9781 -168 -9782 0
 9779  9780 -9781 -168  9783 0
 9779  9780 -9781 -168 -9784 0

c  2+1 --> break 
c    (-b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧  p_168) -> break
c  in CNF:
c     b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 9779 -9780  9781 -168 1162 0


c  2-1 --> 1
c    (-b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧ -p_168) -> (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0)
c  in CNF:
c     b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_2
c     b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_1
c     b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨  b^{7, 25}_0
c  in DIMACS:
 9779 -9780  9781  168 -9782 0
 9779 -9780  9781  168 -9783 0
 9779 -9780  9781  168  9784 0

c  1-1 --> 0
c    (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0 ∧ -p_168) -> (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧ -b^{7, 25}_0)
c  in CNF:
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_2
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_1
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_0
c  in DIMACS:
 9779  9780 -9781  168 -9782 0
 9779  9780 -9781  168 -9783 0
 9779  9780 -9781  168 -9784 0

c  0-1 --> -1
c    (-b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧ -p_168) -> ( b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0)
c  in CNF:
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨  b^{7, 25}_2
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_1
c     b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨  b^{7, 25}_0
c  in DIMACS:
 9779  9780  9781  168  9782 0
 9779  9780  9781  168 -9783 0
 9779  9780  9781  168  9784 0

c  -1-1 --> -2
c    ( b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧  b^{7, 24}_0 ∧ -p_168) -> ( b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0)
c  in CNF:
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨  b^{7, 25}_2
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨  b^{7, 25}_1
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨  p_168 ∨ -b^{7, 25}_0
c  in DIMACS:
-9779  9780 -9781  168  9782 0
-9779  9780 -9781  168  9783 0
-9779  9780 -9781  168 -9784 0

c  -2-1 --> break 
c    ( b^{7, 24}_2 ∧  b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨  b^{7, 24}_0 ∨  p_168 ∨ break
c  in DIMACS:
-9779 -9780  9781  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 24}_2 ∧ -b^{7, 24}_1 ∧ -b^{7, 24}_0 ∧ true) 
c  in CNF:
c    -b^{7, 24}_2 ∨  b^{7, 24}_1 ∨  b^{7, 24}_0 ∨ false 
c  in DIMACS:
-9779  9780  9781  0

c  3 does not represent an automaton state.
c    -(-b^{7, 24}_2 ∧  b^{7, 24}_1 ∧  b^{7, 24}_0 ∧ true) 
c  in CNF:
c     b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ false 
c  in DIMACS:
 9779 -9780 -9781  0
c  -3 does not represent an automaton state.
c    -( b^{7, 24}_2 ∧  b^{7, 24}_1 ∧  b^{7, 24}_0 ∧ true) 
c  in CNF:
c    -b^{7, 24}_2 ∨ -b^{7, 24}_1 ∨ -b^{7, 24}_0 ∨ false 
c  in DIMACS:
-9779 -9780 -9781  0

c i = 25
c  -2+1 --> -1
c    ( b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧  p_175) -> ( b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0)
c  in CNF:
c    -b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨  b^{7, 26}_2
c    -b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_1
c    -b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨  b^{7, 26}_0
c  in DIMACS:
-9782 -9783  9784 -175  9785 0
-9782 -9783  9784 -175 -9786 0
-9782 -9783  9784 -175  9787 0

c  -1+1 --> 0
c    ( b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0 ∧  p_175) -> (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧ -b^{7, 26}_0)
c  in CNF:
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_2
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_1
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_0
c  in DIMACS:
-9782  9783 -9784 -175 -9785 0
-9782  9783 -9784 -175 -9786 0
-9782  9783 -9784 -175 -9787 0

c  0+1 --> 1
c    (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧  p_175) -> (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0)
c  in CNF:
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_2
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_1
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨  b^{7, 26}_0
c  in DIMACS:
 9782  9783  9784 -175 -9785 0
 9782  9783  9784 -175 -9786 0
 9782  9783  9784 -175  9787 0

c  1+1 --> 2
c    (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0 ∧  p_175) -> (-b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0)
c  in CNF:
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_2
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨  b^{7, 26}_1
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ -p_175 ∨ -b^{7, 26}_0
c  in DIMACS:
 9782  9783 -9784 -175 -9785 0
 9782  9783 -9784 -175  9786 0
 9782  9783 -9784 -175 -9787 0

c  2+1 --> break 
c    (-b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧  p_175) -> break
c  in CNF:
c     b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 9782 -9783  9784 -175 1162 0


c  2-1 --> 1
c    (-b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧ -p_175) -> (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0)
c  in CNF:
c     b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_2
c     b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_1
c     b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨  b^{7, 26}_0
c  in DIMACS:
 9782 -9783  9784  175 -9785 0
 9782 -9783  9784  175 -9786 0
 9782 -9783  9784  175  9787 0

c  1-1 --> 0
c    (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0 ∧ -p_175) -> (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧ -b^{7, 26}_0)
c  in CNF:
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_2
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_1
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_0
c  in DIMACS:
 9782  9783 -9784  175 -9785 0
 9782  9783 -9784  175 -9786 0
 9782  9783 -9784  175 -9787 0

c  0-1 --> -1
c    (-b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧ -p_175) -> ( b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0)
c  in CNF:
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨  b^{7, 26}_2
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_1
c     b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨  b^{7, 26}_0
c  in DIMACS:
 9782  9783  9784  175  9785 0
 9782  9783  9784  175 -9786 0
 9782  9783  9784  175  9787 0

c  -1-1 --> -2
c    ( b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧  b^{7, 25}_0 ∧ -p_175) -> ( b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0)
c  in CNF:
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨  b^{7, 26}_2
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨  b^{7, 26}_1
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨  p_175 ∨ -b^{7, 26}_0
c  in DIMACS:
-9782  9783 -9784  175  9785 0
-9782  9783 -9784  175  9786 0
-9782  9783 -9784  175 -9787 0

c  -2-1 --> break 
c    ( b^{7, 25}_2 ∧  b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨  b^{7, 25}_0 ∨  p_175 ∨ break
c  in DIMACS:
-9782 -9783  9784  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 25}_2 ∧ -b^{7, 25}_1 ∧ -b^{7, 25}_0 ∧ true) 
c  in CNF:
c    -b^{7, 25}_2 ∨  b^{7, 25}_1 ∨  b^{7, 25}_0 ∨ false 
c  in DIMACS:
-9782  9783  9784  0

c  3 does not represent an automaton state.
c    -(-b^{7, 25}_2 ∧  b^{7, 25}_1 ∧  b^{7, 25}_0 ∧ true) 
c  in CNF:
c     b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ false 
c  in DIMACS:
 9782 -9783 -9784  0
c  -3 does not represent an automaton state.
c    -( b^{7, 25}_2 ∧  b^{7, 25}_1 ∧  b^{7, 25}_0 ∧ true) 
c  in CNF:
c    -b^{7, 25}_2 ∨ -b^{7, 25}_1 ∨ -b^{7, 25}_0 ∨ false 
c  in DIMACS:
-9782 -9783 -9784  0

c i = 26
c  -2+1 --> -1
c    ( b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧  p_182) -> ( b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0)
c  in CNF:
c    -b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨  b^{7, 27}_2
c    -b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_1
c    -b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨  b^{7, 27}_0
c  in DIMACS:
-9785 -9786  9787 -182  9788 0
-9785 -9786  9787 -182 -9789 0
-9785 -9786  9787 -182  9790 0

c  -1+1 --> 0
c    ( b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0 ∧  p_182) -> (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧ -b^{7, 27}_0)
c  in CNF:
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_2
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_1
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_0
c  in DIMACS:
-9785  9786 -9787 -182 -9788 0
-9785  9786 -9787 -182 -9789 0
-9785  9786 -9787 -182 -9790 0

c  0+1 --> 1
c    (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧  p_182) -> (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0)
c  in CNF:
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_2
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_1
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨  b^{7, 27}_0
c  in DIMACS:
 9785  9786  9787 -182 -9788 0
 9785  9786  9787 -182 -9789 0
 9785  9786  9787 -182  9790 0

c  1+1 --> 2
c    (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0 ∧  p_182) -> (-b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0)
c  in CNF:
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_2
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨  b^{7, 27}_1
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ -p_182 ∨ -b^{7, 27}_0
c  in DIMACS:
 9785  9786 -9787 -182 -9788 0
 9785  9786 -9787 -182  9789 0
 9785  9786 -9787 -182 -9790 0

c  2+1 --> break 
c    (-b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧  p_182) -> break
c  in CNF:
c     b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 9785 -9786  9787 -182 1162 0


c  2-1 --> 1
c    (-b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧ -p_182) -> (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0)
c  in CNF:
c     b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_2
c     b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_1
c     b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨  b^{7, 27}_0
c  in DIMACS:
 9785 -9786  9787  182 -9788 0
 9785 -9786  9787  182 -9789 0
 9785 -9786  9787  182  9790 0

c  1-1 --> 0
c    (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0 ∧ -p_182) -> (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧ -b^{7, 27}_0)
c  in CNF:
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_2
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_1
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_0
c  in DIMACS:
 9785  9786 -9787  182 -9788 0
 9785  9786 -9787  182 -9789 0
 9785  9786 -9787  182 -9790 0

c  0-1 --> -1
c    (-b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧ -p_182) -> ( b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0)
c  in CNF:
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨  b^{7, 27}_2
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_1
c     b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨  b^{7, 27}_0
c  in DIMACS:
 9785  9786  9787  182  9788 0
 9785  9786  9787  182 -9789 0
 9785  9786  9787  182  9790 0

c  -1-1 --> -2
c    ( b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧  b^{7, 26}_0 ∧ -p_182) -> ( b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0)
c  in CNF:
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨  b^{7, 27}_2
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨  b^{7, 27}_1
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨  p_182 ∨ -b^{7, 27}_0
c  in DIMACS:
-9785  9786 -9787  182  9788 0
-9785  9786 -9787  182  9789 0
-9785  9786 -9787  182 -9790 0

c  -2-1 --> break 
c    ( b^{7, 26}_2 ∧  b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨  b^{7, 26}_0 ∨  p_182 ∨ break
c  in DIMACS:
-9785 -9786  9787  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 26}_2 ∧ -b^{7, 26}_1 ∧ -b^{7, 26}_0 ∧ true) 
c  in CNF:
c    -b^{7, 26}_2 ∨  b^{7, 26}_1 ∨  b^{7, 26}_0 ∨ false 
c  in DIMACS:
-9785  9786  9787  0

c  3 does not represent an automaton state.
c    -(-b^{7, 26}_2 ∧  b^{7, 26}_1 ∧  b^{7, 26}_0 ∧ true) 
c  in CNF:
c     b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ false 
c  in DIMACS:
 9785 -9786 -9787  0
c  -3 does not represent an automaton state.
c    -( b^{7, 26}_2 ∧  b^{7, 26}_1 ∧  b^{7, 26}_0 ∧ true) 
c  in CNF:
c    -b^{7, 26}_2 ∨ -b^{7, 26}_1 ∨ -b^{7, 26}_0 ∨ false 
c  in DIMACS:
-9785 -9786 -9787  0

c i = 27
c  -2+1 --> -1
c    ( b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧  p_189) -> ( b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0)
c  in CNF:
c    -b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨  b^{7, 28}_2
c    -b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_1
c    -b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨  b^{7, 28}_0
c  in DIMACS:
-9788 -9789  9790 -189  9791 0
-9788 -9789  9790 -189 -9792 0
-9788 -9789  9790 -189  9793 0

c  -1+1 --> 0
c    ( b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0 ∧  p_189) -> (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧ -b^{7, 28}_0)
c  in CNF:
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_2
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_1
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_0
c  in DIMACS:
-9788  9789 -9790 -189 -9791 0
-9788  9789 -9790 -189 -9792 0
-9788  9789 -9790 -189 -9793 0

c  0+1 --> 1
c    (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧  p_189) -> (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0)
c  in CNF:
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_2
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_1
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨  b^{7, 28}_0
c  in DIMACS:
 9788  9789  9790 -189 -9791 0
 9788  9789  9790 -189 -9792 0
 9788  9789  9790 -189  9793 0

c  1+1 --> 2
c    (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0 ∧  p_189) -> (-b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0)
c  in CNF:
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_2
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨  b^{7, 28}_1
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ -p_189 ∨ -b^{7, 28}_0
c  in DIMACS:
 9788  9789 -9790 -189 -9791 0
 9788  9789 -9790 -189  9792 0
 9788  9789 -9790 -189 -9793 0

c  2+1 --> break 
c    (-b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧  p_189) -> break
c  in CNF:
c     b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 9788 -9789  9790 -189 1162 0


c  2-1 --> 1
c    (-b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧ -p_189) -> (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0)
c  in CNF:
c     b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_2
c     b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_1
c     b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨  b^{7, 28}_0
c  in DIMACS:
 9788 -9789  9790  189 -9791 0
 9788 -9789  9790  189 -9792 0
 9788 -9789  9790  189  9793 0

c  1-1 --> 0
c    (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0 ∧ -p_189) -> (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧ -b^{7, 28}_0)
c  in CNF:
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_2
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_1
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_0
c  in DIMACS:
 9788  9789 -9790  189 -9791 0
 9788  9789 -9790  189 -9792 0
 9788  9789 -9790  189 -9793 0

c  0-1 --> -1
c    (-b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧ -p_189) -> ( b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0)
c  in CNF:
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨  b^{7, 28}_2
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_1
c     b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨  b^{7, 28}_0
c  in DIMACS:
 9788  9789  9790  189  9791 0
 9788  9789  9790  189 -9792 0
 9788  9789  9790  189  9793 0

c  -1-1 --> -2
c    ( b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧  b^{7, 27}_0 ∧ -p_189) -> ( b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0)
c  in CNF:
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨  b^{7, 28}_2
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨  b^{7, 28}_1
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨  p_189 ∨ -b^{7, 28}_0
c  in DIMACS:
-9788  9789 -9790  189  9791 0
-9788  9789 -9790  189  9792 0
-9788  9789 -9790  189 -9793 0

c  -2-1 --> break 
c    ( b^{7, 27}_2 ∧  b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨  b^{7, 27}_0 ∨  p_189 ∨ break
c  in DIMACS:
-9788 -9789  9790  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 27}_2 ∧ -b^{7, 27}_1 ∧ -b^{7, 27}_0 ∧ true) 
c  in CNF:
c    -b^{7, 27}_2 ∨  b^{7, 27}_1 ∨  b^{7, 27}_0 ∨ false 
c  in DIMACS:
-9788  9789  9790  0

c  3 does not represent an automaton state.
c    -(-b^{7, 27}_2 ∧  b^{7, 27}_1 ∧  b^{7, 27}_0 ∧ true) 
c  in CNF:
c     b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ false 
c  in DIMACS:
 9788 -9789 -9790  0
c  -3 does not represent an automaton state.
c    -( b^{7, 27}_2 ∧  b^{7, 27}_1 ∧  b^{7, 27}_0 ∧ true) 
c  in CNF:
c    -b^{7, 27}_2 ∨ -b^{7, 27}_1 ∨ -b^{7, 27}_0 ∨ false 
c  in DIMACS:
-9788 -9789 -9790  0

c i = 28
c  -2+1 --> -1
c    ( b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧  p_196) -> ( b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0)
c  in CNF:
c    -b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨  b^{7, 29}_2
c    -b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_1
c    -b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨  b^{7, 29}_0
c  in DIMACS:
-9791 -9792  9793 -196  9794 0
-9791 -9792  9793 -196 -9795 0
-9791 -9792  9793 -196  9796 0

c  -1+1 --> 0
c    ( b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0 ∧  p_196) -> (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧ -b^{7, 29}_0)
c  in CNF:
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_2
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_1
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_0
c  in DIMACS:
-9791  9792 -9793 -196 -9794 0
-9791  9792 -9793 -196 -9795 0
-9791  9792 -9793 -196 -9796 0

c  0+1 --> 1
c    (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧  p_196) -> (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0)
c  in CNF:
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_2
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_1
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨  b^{7, 29}_0
c  in DIMACS:
 9791  9792  9793 -196 -9794 0
 9791  9792  9793 -196 -9795 0
 9791  9792  9793 -196  9796 0

c  1+1 --> 2
c    (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0 ∧  p_196) -> (-b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0)
c  in CNF:
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_2
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨  b^{7, 29}_1
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ -p_196 ∨ -b^{7, 29}_0
c  in DIMACS:
 9791  9792 -9793 -196 -9794 0
 9791  9792 -9793 -196  9795 0
 9791  9792 -9793 -196 -9796 0

c  2+1 --> break 
c    (-b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧  p_196) -> break
c  in CNF:
c     b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 9791 -9792  9793 -196 1162 0


c  2-1 --> 1
c    (-b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧ -p_196) -> (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0)
c  in CNF:
c     b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_2
c     b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_1
c     b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨  b^{7, 29}_0
c  in DIMACS:
 9791 -9792  9793  196 -9794 0
 9791 -9792  9793  196 -9795 0
 9791 -9792  9793  196  9796 0

c  1-1 --> 0
c    (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0 ∧ -p_196) -> (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧ -b^{7, 29}_0)
c  in CNF:
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_2
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_1
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_0
c  in DIMACS:
 9791  9792 -9793  196 -9794 0
 9791  9792 -9793  196 -9795 0
 9791  9792 -9793  196 -9796 0

c  0-1 --> -1
c    (-b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧ -p_196) -> ( b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0)
c  in CNF:
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨  b^{7, 29}_2
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_1
c     b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨  b^{7, 29}_0
c  in DIMACS:
 9791  9792  9793  196  9794 0
 9791  9792  9793  196 -9795 0
 9791  9792  9793  196  9796 0

c  -1-1 --> -2
c    ( b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧  b^{7, 28}_0 ∧ -p_196) -> ( b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0)
c  in CNF:
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨  b^{7, 29}_2
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨  b^{7, 29}_1
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨  p_196 ∨ -b^{7, 29}_0
c  in DIMACS:
-9791  9792 -9793  196  9794 0
-9791  9792 -9793  196  9795 0
-9791  9792 -9793  196 -9796 0

c  -2-1 --> break 
c    ( b^{7, 28}_2 ∧  b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨  b^{7, 28}_0 ∨  p_196 ∨ break
c  in DIMACS:
-9791 -9792  9793  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 28}_2 ∧ -b^{7, 28}_1 ∧ -b^{7, 28}_0 ∧ true) 
c  in CNF:
c    -b^{7, 28}_2 ∨  b^{7, 28}_1 ∨  b^{7, 28}_0 ∨ false 
c  in DIMACS:
-9791  9792  9793  0

c  3 does not represent an automaton state.
c    -(-b^{7, 28}_2 ∧  b^{7, 28}_1 ∧  b^{7, 28}_0 ∧ true) 
c  in CNF:
c     b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ false 
c  in DIMACS:
 9791 -9792 -9793  0
c  -3 does not represent an automaton state.
c    -( b^{7, 28}_2 ∧  b^{7, 28}_1 ∧  b^{7, 28}_0 ∧ true) 
c  in CNF:
c    -b^{7, 28}_2 ∨ -b^{7, 28}_1 ∨ -b^{7, 28}_0 ∨ false 
c  in DIMACS:
-9791 -9792 -9793  0

c i = 29
c  -2+1 --> -1
c    ( b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧  p_203) -> ( b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0)
c  in CNF:
c    -b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨  b^{7, 30}_2
c    -b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_1
c    -b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨  b^{7, 30}_0
c  in DIMACS:
-9794 -9795  9796 -203  9797 0
-9794 -9795  9796 -203 -9798 0
-9794 -9795  9796 -203  9799 0

c  -1+1 --> 0
c    ( b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0 ∧  p_203) -> (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧ -b^{7, 30}_0)
c  in CNF:
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_2
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_1
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_0
c  in DIMACS:
-9794  9795 -9796 -203 -9797 0
-9794  9795 -9796 -203 -9798 0
-9794  9795 -9796 -203 -9799 0

c  0+1 --> 1
c    (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧  p_203) -> (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0)
c  in CNF:
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_2
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_1
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨  b^{7, 30}_0
c  in DIMACS:
 9794  9795  9796 -203 -9797 0
 9794  9795  9796 -203 -9798 0
 9794  9795  9796 -203  9799 0

c  1+1 --> 2
c    (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0 ∧  p_203) -> (-b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0)
c  in CNF:
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_2
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨  b^{7, 30}_1
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ -p_203 ∨ -b^{7, 30}_0
c  in DIMACS:
 9794  9795 -9796 -203 -9797 0
 9794  9795 -9796 -203  9798 0
 9794  9795 -9796 -203 -9799 0

c  2+1 --> break 
c    (-b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧  p_203) -> break
c  in CNF:
c     b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ -p_203 ∨ break
c  in DIMACS:
 9794 -9795  9796 -203 1162 0


c  2-1 --> 1
c    (-b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧ -p_203) -> (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0)
c  in CNF:
c     b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_2
c     b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_1
c     b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨  b^{7, 30}_0
c  in DIMACS:
 9794 -9795  9796  203 -9797 0
 9794 -9795  9796  203 -9798 0
 9794 -9795  9796  203  9799 0

c  1-1 --> 0
c    (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0 ∧ -p_203) -> (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧ -b^{7, 30}_0)
c  in CNF:
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_2
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_1
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_0
c  in DIMACS:
 9794  9795 -9796  203 -9797 0
 9794  9795 -9796  203 -9798 0
 9794  9795 -9796  203 -9799 0

c  0-1 --> -1
c    (-b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧ -p_203) -> ( b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0)
c  in CNF:
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨  b^{7, 30}_2
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_1
c     b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨  b^{7, 30}_0
c  in DIMACS:
 9794  9795  9796  203  9797 0
 9794  9795  9796  203 -9798 0
 9794  9795  9796  203  9799 0

c  -1-1 --> -2
c    ( b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧  b^{7, 29}_0 ∧ -p_203) -> ( b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0)
c  in CNF:
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨  b^{7, 30}_2
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨  b^{7, 30}_1
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨  p_203 ∨ -b^{7, 30}_0
c  in DIMACS:
-9794  9795 -9796  203  9797 0
-9794  9795 -9796  203  9798 0
-9794  9795 -9796  203 -9799 0

c  -2-1 --> break 
c    ( b^{7, 29}_2 ∧  b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧ -p_203) -> break
c  in CNF:
c    -b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨  b^{7, 29}_0 ∨  p_203 ∨ break
c  in DIMACS:
-9794 -9795  9796  203 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 29}_2 ∧ -b^{7, 29}_1 ∧ -b^{7, 29}_0 ∧ true) 
c  in CNF:
c    -b^{7, 29}_2 ∨  b^{7, 29}_1 ∨  b^{7, 29}_0 ∨ false 
c  in DIMACS:
-9794  9795  9796  0

c  3 does not represent an automaton state.
c    -(-b^{7, 29}_2 ∧  b^{7, 29}_1 ∧  b^{7, 29}_0 ∧ true) 
c  in CNF:
c     b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ false 
c  in DIMACS:
 9794 -9795 -9796  0
c  -3 does not represent an automaton state.
c    -( b^{7, 29}_2 ∧  b^{7, 29}_1 ∧  b^{7, 29}_0 ∧ true) 
c  in CNF:
c    -b^{7, 29}_2 ∨ -b^{7, 29}_1 ∨ -b^{7, 29}_0 ∨ false 
c  in DIMACS:
-9794 -9795 -9796  0

c i = 30
c  -2+1 --> -1
c    ( b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧  p_210) -> ( b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0)
c  in CNF:
c    -b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨  b^{7, 31}_2
c    -b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_1
c    -b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨  b^{7, 31}_0
c  in DIMACS:
-9797 -9798  9799 -210  9800 0
-9797 -9798  9799 -210 -9801 0
-9797 -9798  9799 -210  9802 0

c  -1+1 --> 0
c    ( b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0 ∧  p_210) -> (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧ -b^{7, 31}_0)
c  in CNF:
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_2
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_1
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_0
c  in DIMACS:
-9797  9798 -9799 -210 -9800 0
-9797  9798 -9799 -210 -9801 0
-9797  9798 -9799 -210 -9802 0

c  0+1 --> 1
c    (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧  p_210) -> (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0)
c  in CNF:
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_2
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_1
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨  b^{7, 31}_0
c  in DIMACS:
 9797  9798  9799 -210 -9800 0
 9797  9798  9799 -210 -9801 0
 9797  9798  9799 -210  9802 0

c  1+1 --> 2
c    (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0 ∧  p_210) -> (-b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0)
c  in CNF:
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_2
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨  b^{7, 31}_1
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ -p_210 ∨ -b^{7, 31}_0
c  in DIMACS:
 9797  9798 -9799 -210 -9800 0
 9797  9798 -9799 -210  9801 0
 9797  9798 -9799 -210 -9802 0

c  2+1 --> break 
c    (-b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧  p_210) -> break
c  in CNF:
c     b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 9797 -9798  9799 -210 1162 0


c  2-1 --> 1
c    (-b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧ -p_210) -> (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0)
c  in CNF:
c     b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_2
c     b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_1
c     b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨  b^{7, 31}_0
c  in DIMACS:
 9797 -9798  9799  210 -9800 0
 9797 -9798  9799  210 -9801 0
 9797 -9798  9799  210  9802 0

c  1-1 --> 0
c    (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0 ∧ -p_210) -> (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧ -b^{7, 31}_0)
c  in CNF:
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_2
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_1
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_0
c  in DIMACS:
 9797  9798 -9799  210 -9800 0
 9797  9798 -9799  210 -9801 0
 9797  9798 -9799  210 -9802 0

c  0-1 --> -1
c    (-b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧ -p_210) -> ( b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0)
c  in CNF:
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨  b^{7, 31}_2
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_1
c     b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨  b^{7, 31}_0
c  in DIMACS:
 9797  9798  9799  210  9800 0
 9797  9798  9799  210 -9801 0
 9797  9798  9799  210  9802 0

c  -1-1 --> -2
c    ( b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧  b^{7, 30}_0 ∧ -p_210) -> ( b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0)
c  in CNF:
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨  b^{7, 31}_2
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨  b^{7, 31}_1
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨  p_210 ∨ -b^{7, 31}_0
c  in DIMACS:
-9797  9798 -9799  210  9800 0
-9797  9798 -9799  210  9801 0
-9797  9798 -9799  210 -9802 0

c  -2-1 --> break 
c    ( b^{7, 30}_2 ∧  b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨  b^{7, 30}_0 ∨  p_210 ∨ break
c  in DIMACS:
-9797 -9798  9799  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 30}_2 ∧ -b^{7, 30}_1 ∧ -b^{7, 30}_0 ∧ true) 
c  in CNF:
c    -b^{7, 30}_2 ∨  b^{7, 30}_1 ∨  b^{7, 30}_0 ∨ false 
c  in DIMACS:
-9797  9798  9799  0

c  3 does not represent an automaton state.
c    -(-b^{7, 30}_2 ∧  b^{7, 30}_1 ∧  b^{7, 30}_0 ∧ true) 
c  in CNF:
c     b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ false 
c  in DIMACS:
 9797 -9798 -9799  0
c  -3 does not represent an automaton state.
c    -( b^{7, 30}_2 ∧  b^{7, 30}_1 ∧  b^{7, 30}_0 ∧ true) 
c  in CNF:
c    -b^{7, 30}_2 ∨ -b^{7, 30}_1 ∨ -b^{7, 30}_0 ∨ false 
c  in DIMACS:
-9797 -9798 -9799  0

c i = 31
c  -2+1 --> -1
c    ( b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧  p_217) -> ( b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0)
c  in CNF:
c    -b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨  b^{7, 32}_2
c    -b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_1
c    -b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨  b^{7, 32}_0
c  in DIMACS:
-9800 -9801  9802 -217  9803 0
-9800 -9801  9802 -217 -9804 0
-9800 -9801  9802 -217  9805 0

c  -1+1 --> 0
c    ( b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0 ∧  p_217) -> (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧ -b^{7, 32}_0)
c  in CNF:
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_2
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_1
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_0
c  in DIMACS:
-9800  9801 -9802 -217 -9803 0
-9800  9801 -9802 -217 -9804 0
-9800  9801 -9802 -217 -9805 0

c  0+1 --> 1
c    (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧  p_217) -> (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0)
c  in CNF:
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_2
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_1
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨  b^{7, 32}_0
c  in DIMACS:
 9800  9801  9802 -217 -9803 0
 9800  9801  9802 -217 -9804 0
 9800  9801  9802 -217  9805 0

c  1+1 --> 2
c    (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0 ∧  p_217) -> (-b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0)
c  in CNF:
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_2
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨  b^{7, 32}_1
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ -p_217 ∨ -b^{7, 32}_0
c  in DIMACS:
 9800  9801 -9802 -217 -9803 0
 9800  9801 -9802 -217  9804 0
 9800  9801 -9802 -217 -9805 0

c  2+1 --> break 
c    (-b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧  p_217) -> break
c  in CNF:
c     b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ -p_217 ∨ break
c  in DIMACS:
 9800 -9801  9802 -217 1162 0


c  2-1 --> 1
c    (-b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧ -p_217) -> (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0)
c  in CNF:
c     b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_2
c     b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_1
c     b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨  b^{7, 32}_0
c  in DIMACS:
 9800 -9801  9802  217 -9803 0
 9800 -9801  9802  217 -9804 0
 9800 -9801  9802  217  9805 0

c  1-1 --> 0
c    (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0 ∧ -p_217) -> (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧ -b^{7, 32}_0)
c  in CNF:
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_2
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_1
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_0
c  in DIMACS:
 9800  9801 -9802  217 -9803 0
 9800  9801 -9802  217 -9804 0
 9800  9801 -9802  217 -9805 0

c  0-1 --> -1
c    (-b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧ -p_217) -> ( b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0)
c  in CNF:
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨  b^{7, 32}_2
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_1
c     b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨  b^{7, 32}_0
c  in DIMACS:
 9800  9801  9802  217  9803 0
 9800  9801  9802  217 -9804 0
 9800  9801  9802  217  9805 0

c  -1-1 --> -2
c    ( b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧  b^{7, 31}_0 ∧ -p_217) -> ( b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0)
c  in CNF:
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨  b^{7, 32}_2
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨  b^{7, 32}_1
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨  p_217 ∨ -b^{7, 32}_0
c  in DIMACS:
-9800  9801 -9802  217  9803 0
-9800  9801 -9802  217  9804 0
-9800  9801 -9802  217 -9805 0

c  -2-1 --> break 
c    ( b^{7, 31}_2 ∧  b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧ -p_217) -> break
c  in CNF:
c    -b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨  b^{7, 31}_0 ∨  p_217 ∨ break
c  in DIMACS:
-9800 -9801  9802  217 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 31}_2 ∧ -b^{7, 31}_1 ∧ -b^{7, 31}_0 ∧ true) 
c  in CNF:
c    -b^{7, 31}_2 ∨  b^{7, 31}_1 ∨  b^{7, 31}_0 ∨ false 
c  in DIMACS:
-9800  9801  9802  0

c  3 does not represent an automaton state.
c    -(-b^{7, 31}_2 ∧  b^{7, 31}_1 ∧  b^{7, 31}_0 ∧ true) 
c  in CNF:
c     b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ false 
c  in DIMACS:
 9800 -9801 -9802  0
c  -3 does not represent an automaton state.
c    -( b^{7, 31}_2 ∧  b^{7, 31}_1 ∧  b^{7, 31}_0 ∧ true) 
c  in CNF:
c    -b^{7, 31}_2 ∨ -b^{7, 31}_1 ∨ -b^{7, 31}_0 ∨ false 
c  in DIMACS:
-9800 -9801 -9802  0

c i = 32
c  -2+1 --> -1
c    ( b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧  p_224) -> ( b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0)
c  in CNF:
c    -b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨  b^{7, 33}_2
c    -b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_1
c    -b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨  b^{7, 33}_0
c  in DIMACS:
-9803 -9804  9805 -224  9806 0
-9803 -9804  9805 -224 -9807 0
-9803 -9804  9805 -224  9808 0

c  -1+1 --> 0
c    ( b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0 ∧  p_224) -> (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧ -b^{7, 33}_0)
c  in CNF:
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_2
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_1
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_0
c  in DIMACS:
-9803  9804 -9805 -224 -9806 0
-9803  9804 -9805 -224 -9807 0
-9803  9804 -9805 -224 -9808 0

c  0+1 --> 1
c    (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧  p_224) -> (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0)
c  in CNF:
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_2
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_1
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨  b^{7, 33}_0
c  in DIMACS:
 9803  9804  9805 -224 -9806 0
 9803  9804  9805 -224 -9807 0
 9803  9804  9805 -224  9808 0

c  1+1 --> 2
c    (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0 ∧  p_224) -> (-b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0)
c  in CNF:
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_2
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨  b^{7, 33}_1
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ -p_224 ∨ -b^{7, 33}_0
c  in DIMACS:
 9803  9804 -9805 -224 -9806 0
 9803  9804 -9805 -224  9807 0
 9803  9804 -9805 -224 -9808 0

c  2+1 --> break 
c    (-b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧  p_224) -> break
c  in CNF:
c     b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 9803 -9804  9805 -224 1162 0


c  2-1 --> 1
c    (-b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧ -p_224) -> (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0)
c  in CNF:
c     b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_2
c     b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_1
c     b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨  b^{7, 33}_0
c  in DIMACS:
 9803 -9804  9805  224 -9806 0
 9803 -9804  9805  224 -9807 0
 9803 -9804  9805  224  9808 0

c  1-1 --> 0
c    (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0 ∧ -p_224) -> (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧ -b^{7, 33}_0)
c  in CNF:
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_2
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_1
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_0
c  in DIMACS:
 9803  9804 -9805  224 -9806 0
 9803  9804 -9805  224 -9807 0
 9803  9804 -9805  224 -9808 0

c  0-1 --> -1
c    (-b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧ -p_224) -> ( b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0)
c  in CNF:
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨  b^{7, 33}_2
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_1
c     b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨  b^{7, 33}_0
c  in DIMACS:
 9803  9804  9805  224  9806 0
 9803  9804  9805  224 -9807 0
 9803  9804  9805  224  9808 0

c  -1-1 --> -2
c    ( b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧  b^{7, 32}_0 ∧ -p_224) -> ( b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0)
c  in CNF:
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨  b^{7, 33}_2
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨  b^{7, 33}_1
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨  p_224 ∨ -b^{7, 33}_0
c  in DIMACS:
-9803  9804 -9805  224  9806 0
-9803  9804 -9805  224  9807 0
-9803  9804 -9805  224 -9808 0

c  -2-1 --> break 
c    ( b^{7, 32}_2 ∧  b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨  b^{7, 32}_0 ∨  p_224 ∨ break
c  in DIMACS:
-9803 -9804  9805  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 32}_2 ∧ -b^{7, 32}_1 ∧ -b^{7, 32}_0 ∧ true) 
c  in CNF:
c    -b^{7, 32}_2 ∨  b^{7, 32}_1 ∨  b^{7, 32}_0 ∨ false 
c  in DIMACS:
-9803  9804  9805  0

c  3 does not represent an automaton state.
c    -(-b^{7, 32}_2 ∧  b^{7, 32}_1 ∧  b^{7, 32}_0 ∧ true) 
c  in CNF:
c     b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ false 
c  in DIMACS:
 9803 -9804 -9805  0
c  -3 does not represent an automaton state.
c    -( b^{7, 32}_2 ∧  b^{7, 32}_1 ∧  b^{7, 32}_0 ∧ true) 
c  in CNF:
c    -b^{7, 32}_2 ∨ -b^{7, 32}_1 ∨ -b^{7, 32}_0 ∨ false 
c  in DIMACS:
-9803 -9804 -9805  0

c i = 33
c  -2+1 --> -1
c    ( b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧  p_231) -> ( b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0)
c  in CNF:
c    -b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨  b^{7, 34}_2
c    -b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_1
c    -b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨  b^{7, 34}_0
c  in DIMACS:
-9806 -9807  9808 -231  9809 0
-9806 -9807  9808 -231 -9810 0
-9806 -9807  9808 -231  9811 0

c  -1+1 --> 0
c    ( b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0 ∧  p_231) -> (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧ -b^{7, 34}_0)
c  in CNF:
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_2
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_1
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_0
c  in DIMACS:
-9806  9807 -9808 -231 -9809 0
-9806  9807 -9808 -231 -9810 0
-9806  9807 -9808 -231 -9811 0

c  0+1 --> 1
c    (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧  p_231) -> (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0)
c  in CNF:
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_2
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_1
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨  b^{7, 34}_0
c  in DIMACS:
 9806  9807  9808 -231 -9809 0
 9806  9807  9808 -231 -9810 0
 9806  9807  9808 -231  9811 0

c  1+1 --> 2
c    (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0 ∧  p_231) -> (-b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0)
c  in CNF:
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_2
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨  b^{7, 34}_1
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ -p_231 ∨ -b^{7, 34}_0
c  in DIMACS:
 9806  9807 -9808 -231 -9809 0
 9806  9807 -9808 -231  9810 0
 9806  9807 -9808 -231 -9811 0

c  2+1 --> break 
c    (-b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧  p_231) -> break
c  in CNF:
c     b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 9806 -9807  9808 -231 1162 0


c  2-1 --> 1
c    (-b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧ -p_231) -> (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0)
c  in CNF:
c     b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_2
c     b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_1
c     b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨  b^{7, 34}_0
c  in DIMACS:
 9806 -9807  9808  231 -9809 0
 9806 -9807  9808  231 -9810 0
 9806 -9807  9808  231  9811 0

c  1-1 --> 0
c    (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0 ∧ -p_231) -> (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧ -b^{7, 34}_0)
c  in CNF:
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_2
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_1
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_0
c  in DIMACS:
 9806  9807 -9808  231 -9809 0
 9806  9807 -9808  231 -9810 0
 9806  9807 -9808  231 -9811 0

c  0-1 --> -1
c    (-b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧ -p_231) -> ( b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0)
c  in CNF:
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨  b^{7, 34}_2
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_1
c     b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨  b^{7, 34}_0
c  in DIMACS:
 9806  9807  9808  231  9809 0
 9806  9807  9808  231 -9810 0
 9806  9807  9808  231  9811 0

c  -1-1 --> -2
c    ( b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧  b^{7, 33}_0 ∧ -p_231) -> ( b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0)
c  in CNF:
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨  b^{7, 34}_2
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨  b^{7, 34}_1
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨  p_231 ∨ -b^{7, 34}_0
c  in DIMACS:
-9806  9807 -9808  231  9809 0
-9806  9807 -9808  231  9810 0
-9806  9807 -9808  231 -9811 0

c  -2-1 --> break 
c    ( b^{7, 33}_2 ∧  b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨  b^{7, 33}_0 ∨  p_231 ∨ break
c  in DIMACS:
-9806 -9807  9808  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 33}_2 ∧ -b^{7, 33}_1 ∧ -b^{7, 33}_0 ∧ true) 
c  in CNF:
c    -b^{7, 33}_2 ∨  b^{7, 33}_1 ∨  b^{7, 33}_0 ∨ false 
c  in DIMACS:
-9806  9807  9808  0

c  3 does not represent an automaton state.
c    -(-b^{7, 33}_2 ∧  b^{7, 33}_1 ∧  b^{7, 33}_0 ∧ true) 
c  in CNF:
c     b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ false 
c  in DIMACS:
 9806 -9807 -9808  0
c  -3 does not represent an automaton state.
c    -( b^{7, 33}_2 ∧  b^{7, 33}_1 ∧  b^{7, 33}_0 ∧ true) 
c  in CNF:
c    -b^{7, 33}_2 ∨ -b^{7, 33}_1 ∨ -b^{7, 33}_0 ∨ false 
c  in DIMACS:
-9806 -9807 -9808  0

c i = 34
c  -2+1 --> -1
c    ( b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧  p_238) -> ( b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0)
c  in CNF:
c    -b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨  b^{7, 35}_2
c    -b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_1
c    -b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨  b^{7, 35}_0
c  in DIMACS:
-9809 -9810  9811 -238  9812 0
-9809 -9810  9811 -238 -9813 0
-9809 -9810  9811 -238  9814 0

c  -1+1 --> 0
c    ( b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0 ∧  p_238) -> (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧ -b^{7, 35}_0)
c  in CNF:
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_2
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_1
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_0
c  in DIMACS:
-9809  9810 -9811 -238 -9812 0
-9809  9810 -9811 -238 -9813 0
-9809  9810 -9811 -238 -9814 0

c  0+1 --> 1
c    (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧  p_238) -> (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0)
c  in CNF:
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_2
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_1
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨  b^{7, 35}_0
c  in DIMACS:
 9809  9810  9811 -238 -9812 0
 9809  9810  9811 -238 -9813 0
 9809  9810  9811 -238  9814 0

c  1+1 --> 2
c    (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0 ∧  p_238) -> (-b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0)
c  in CNF:
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_2
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨  b^{7, 35}_1
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ -p_238 ∨ -b^{7, 35}_0
c  in DIMACS:
 9809  9810 -9811 -238 -9812 0
 9809  9810 -9811 -238  9813 0
 9809  9810 -9811 -238 -9814 0

c  2+1 --> break 
c    (-b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧  p_238) -> break
c  in CNF:
c     b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 9809 -9810  9811 -238 1162 0


c  2-1 --> 1
c    (-b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧ -p_238) -> (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0)
c  in CNF:
c     b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_2
c     b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_1
c     b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨  b^{7, 35}_0
c  in DIMACS:
 9809 -9810  9811  238 -9812 0
 9809 -9810  9811  238 -9813 0
 9809 -9810  9811  238  9814 0

c  1-1 --> 0
c    (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0 ∧ -p_238) -> (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧ -b^{7, 35}_0)
c  in CNF:
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_2
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_1
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_0
c  in DIMACS:
 9809  9810 -9811  238 -9812 0
 9809  9810 -9811  238 -9813 0
 9809  9810 -9811  238 -9814 0

c  0-1 --> -1
c    (-b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧ -p_238) -> ( b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0)
c  in CNF:
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨  b^{7, 35}_2
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_1
c     b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨  b^{7, 35}_0
c  in DIMACS:
 9809  9810  9811  238  9812 0
 9809  9810  9811  238 -9813 0
 9809  9810  9811  238  9814 0

c  -1-1 --> -2
c    ( b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧  b^{7, 34}_0 ∧ -p_238) -> ( b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0)
c  in CNF:
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨  b^{7, 35}_2
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨  b^{7, 35}_1
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨  p_238 ∨ -b^{7, 35}_0
c  in DIMACS:
-9809  9810 -9811  238  9812 0
-9809  9810 -9811  238  9813 0
-9809  9810 -9811  238 -9814 0

c  -2-1 --> break 
c    ( b^{7, 34}_2 ∧  b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨  b^{7, 34}_0 ∨  p_238 ∨ break
c  in DIMACS:
-9809 -9810  9811  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 34}_2 ∧ -b^{7, 34}_1 ∧ -b^{7, 34}_0 ∧ true) 
c  in CNF:
c    -b^{7, 34}_2 ∨  b^{7, 34}_1 ∨  b^{7, 34}_0 ∨ false 
c  in DIMACS:
-9809  9810  9811  0

c  3 does not represent an automaton state.
c    -(-b^{7, 34}_2 ∧  b^{7, 34}_1 ∧  b^{7, 34}_0 ∧ true) 
c  in CNF:
c     b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ false 
c  in DIMACS:
 9809 -9810 -9811  0
c  -3 does not represent an automaton state.
c    -( b^{7, 34}_2 ∧  b^{7, 34}_1 ∧  b^{7, 34}_0 ∧ true) 
c  in CNF:
c    -b^{7, 34}_2 ∨ -b^{7, 34}_1 ∨ -b^{7, 34}_0 ∨ false 
c  in DIMACS:
-9809 -9810 -9811  0

c i = 35
c  -2+1 --> -1
c    ( b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧  p_245) -> ( b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0)
c  in CNF:
c    -b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨  b^{7, 36}_2
c    -b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_1
c    -b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨  b^{7, 36}_0
c  in DIMACS:
-9812 -9813  9814 -245  9815 0
-9812 -9813  9814 -245 -9816 0
-9812 -9813  9814 -245  9817 0

c  -1+1 --> 0
c    ( b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0 ∧  p_245) -> (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧ -b^{7, 36}_0)
c  in CNF:
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_2
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_1
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_0
c  in DIMACS:
-9812  9813 -9814 -245 -9815 0
-9812  9813 -9814 -245 -9816 0
-9812  9813 -9814 -245 -9817 0

c  0+1 --> 1
c    (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧  p_245) -> (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0)
c  in CNF:
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_2
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_1
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨  b^{7, 36}_0
c  in DIMACS:
 9812  9813  9814 -245 -9815 0
 9812  9813  9814 -245 -9816 0
 9812  9813  9814 -245  9817 0

c  1+1 --> 2
c    (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0 ∧  p_245) -> (-b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0)
c  in CNF:
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_2
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨  b^{7, 36}_1
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ -p_245 ∨ -b^{7, 36}_0
c  in DIMACS:
 9812  9813 -9814 -245 -9815 0
 9812  9813 -9814 -245  9816 0
 9812  9813 -9814 -245 -9817 0

c  2+1 --> break 
c    (-b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧  p_245) -> break
c  in CNF:
c     b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 9812 -9813  9814 -245 1162 0


c  2-1 --> 1
c    (-b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧ -p_245) -> (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0)
c  in CNF:
c     b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_2
c     b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_1
c     b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨  b^{7, 36}_0
c  in DIMACS:
 9812 -9813  9814  245 -9815 0
 9812 -9813  9814  245 -9816 0
 9812 -9813  9814  245  9817 0

c  1-1 --> 0
c    (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0 ∧ -p_245) -> (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧ -b^{7, 36}_0)
c  in CNF:
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_2
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_1
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_0
c  in DIMACS:
 9812  9813 -9814  245 -9815 0
 9812  9813 -9814  245 -9816 0
 9812  9813 -9814  245 -9817 0

c  0-1 --> -1
c    (-b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧ -p_245) -> ( b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0)
c  in CNF:
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨  b^{7, 36}_2
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_1
c     b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨  b^{7, 36}_0
c  in DIMACS:
 9812  9813  9814  245  9815 0
 9812  9813  9814  245 -9816 0
 9812  9813  9814  245  9817 0

c  -1-1 --> -2
c    ( b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧  b^{7, 35}_0 ∧ -p_245) -> ( b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0)
c  in CNF:
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨  b^{7, 36}_2
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨  b^{7, 36}_1
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨  p_245 ∨ -b^{7, 36}_0
c  in DIMACS:
-9812  9813 -9814  245  9815 0
-9812  9813 -9814  245  9816 0
-9812  9813 -9814  245 -9817 0

c  -2-1 --> break 
c    ( b^{7, 35}_2 ∧  b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨  b^{7, 35}_0 ∨  p_245 ∨ break
c  in DIMACS:
-9812 -9813  9814  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 35}_2 ∧ -b^{7, 35}_1 ∧ -b^{7, 35}_0 ∧ true) 
c  in CNF:
c    -b^{7, 35}_2 ∨  b^{7, 35}_1 ∨  b^{7, 35}_0 ∨ false 
c  in DIMACS:
-9812  9813  9814  0

c  3 does not represent an automaton state.
c    -(-b^{7, 35}_2 ∧  b^{7, 35}_1 ∧  b^{7, 35}_0 ∧ true) 
c  in CNF:
c     b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ false 
c  in DIMACS:
 9812 -9813 -9814  0
c  -3 does not represent an automaton state.
c    -( b^{7, 35}_2 ∧  b^{7, 35}_1 ∧  b^{7, 35}_0 ∧ true) 
c  in CNF:
c    -b^{7, 35}_2 ∨ -b^{7, 35}_1 ∨ -b^{7, 35}_0 ∨ false 
c  in DIMACS:
-9812 -9813 -9814  0

c i = 36
c  -2+1 --> -1
c    ( b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧  p_252) -> ( b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0)
c  in CNF:
c    -b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨  b^{7, 37}_2
c    -b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_1
c    -b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨  b^{7, 37}_0
c  in DIMACS:
-9815 -9816  9817 -252  9818 0
-9815 -9816  9817 -252 -9819 0
-9815 -9816  9817 -252  9820 0

c  -1+1 --> 0
c    ( b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0 ∧  p_252) -> (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧ -b^{7, 37}_0)
c  in CNF:
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_2
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_1
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_0
c  in DIMACS:
-9815  9816 -9817 -252 -9818 0
-9815  9816 -9817 -252 -9819 0
-9815  9816 -9817 -252 -9820 0

c  0+1 --> 1
c    (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧  p_252) -> (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0)
c  in CNF:
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_2
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_1
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨  b^{7, 37}_0
c  in DIMACS:
 9815  9816  9817 -252 -9818 0
 9815  9816  9817 -252 -9819 0
 9815  9816  9817 -252  9820 0

c  1+1 --> 2
c    (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0 ∧  p_252) -> (-b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0)
c  in CNF:
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_2
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨  b^{7, 37}_1
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ -p_252 ∨ -b^{7, 37}_0
c  in DIMACS:
 9815  9816 -9817 -252 -9818 0
 9815  9816 -9817 -252  9819 0
 9815  9816 -9817 -252 -9820 0

c  2+1 --> break 
c    (-b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧  p_252) -> break
c  in CNF:
c     b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 9815 -9816  9817 -252 1162 0


c  2-1 --> 1
c    (-b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧ -p_252) -> (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0)
c  in CNF:
c     b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_2
c     b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_1
c     b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨  b^{7, 37}_0
c  in DIMACS:
 9815 -9816  9817  252 -9818 0
 9815 -9816  9817  252 -9819 0
 9815 -9816  9817  252  9820 0

c  1-1 --> 0
c    (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0 ∧ -p_252) -> (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧ -b^{7, 37}_0)
c  in CNF:
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_2
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_1
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_0
c  in DIMACS:
 9815  9816 -9817  252 -9818 0
 9815  9816 -9817  252 -9819 0
 9815  9816 -9817  252 -9820 0

c  0-1 --> -1
c    (-b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧ -p_252) -> ( b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0)
c  in CNF:
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨  b^{7, 37}_2
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_1
c     b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨  b^{7, 37}_0
c  in DIMACS:
 9815  9816  9817  252  9818 0
 9815  9816  9817  252 -9819 0
 9815  9816  9817  252  9820 0

c  -1-1 --> -2
c    ( b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧  b^{7, 36}_0 ∧ -p_252) -> ( b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0)
c  in CNF:
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨  b^{7, 37}_2
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨  b^{7, 37}_1
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨  p_252 ∨ -b^{7, 37}_0
c  in DIMACS:
-9815  9816 -9817  252  9818 0
-9815  9816 -9817  252  9819 0
-9815  9816 -9817  252 -9820 0

c  -2-1 --> break 
c    ( b^{7, 36}_2 ∧  b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨  b^{7, 36}_0 ∨  p_252 ∨ break
c  in DIMACS:
-9815 -9816  9817  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 36}_2 ∧ -b^{7, 36}_1 ∧ -b^{7, 36}_0 ∧ true) 
c  in CNF:
c    -b^{7, 36}_2 ∨  b^{7, 36}_1 ∨  b^{7, 36}_0 ∨ false 
c  in DIMACS:
-9815  9816  9817  0

c  3 does not represent an automaton state.
c    -(-b^{7, 36}_2 ∧  b^{7, 36}_1 ∧  b^{7, 36}_0 ∧ true) 
c  in CNF:
c     b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ false 
c  in DIMACS:
 9815 -9816 -9817  0
c  -3 does not represent an automaton state.
c    -( b^{7, 36}_2 ∧  b^{7, 36}_1 ∧  b^{7, 36}_0 ∧ true) 
c  in CNF:
c    -b^{7, 36}_2 ∨ -b^{7, 36}_1 ∨ -b^{7, 36}_0 ∨ false 
c  in DIMACS:
-9815 -9816 -9817  0

c i = 37
c  -2+1 --> -1
c    ( b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧  p_259) -> ( b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0)
c  in CNF:
c    -b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨  b^{7, 38}_2
c    -b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_1
c    -b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨  b^{7, 38}_0
c  in DIMACS:
-9818 -9819  9820 -259  9821 0
-9818 -9819  9820 -259 -9822 0
-9818 -9819  9820 -259  9823 0

c  -1+1 --> 0
c    ( b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0 ∧  p_259) -> (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧ -b^{7, 38}_0)
c  in CNF:
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_2
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_1
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_0
c  in DIMACS:
-9818  9819 -9820 -259 -9821 0
-9818  9819 -9820 -259 -9822 0
-9818  9819 -9820 -259 -9823 0

c  0+1 --> 1
c    (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧  p_259) -> (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0)
c  in CNF:
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_2
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_1
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨  b^{7, 38}_0
c  in DIMACS:
 9818  9819  9820 -259 -9821 0
 9818  9819  9820 -259 -9822 0
 9818  9819  9820 -259  9823 0

c  1+1 --> 2
c    (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0 ∧  p_259) -> (-b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0)
c  in CNF:
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_2
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨  b^{7, 38}_1
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ -p_259 ∨ -b^{7, 38}_0
c  in DIMACS:
 9818  9819 -9820 -259 -9821 0
 9818  9819 -9820 -259  9822 0
 9818  9819 -9820 -259 -9823 0

c  2+1 --> break 
c    (-b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧  p_259) -> break
c  in CNF:
c     b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ -p_259 ∨ break
c  in DIMACS:
 9818 -9819  9820 -259 1162 0


c  2-1 --> 1
c    (-b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧ -p_259) -> (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0)
c  in CNF:
c     b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_2
c     b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_1
c     b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨  b^{7, 38}_0
c  in DIMACS:
 9818 -9819  9820  259 -9821 0
 9818 -9819  9820  259 -9822 0
 9818 -9819  9820  259  9823 0

c  1-1 --> 0
c    (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0 ∧ -p_259) -> (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧ -b^{7, 38}_0)
c  in CNF:
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_2
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_1
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_0
c  in DIMACS:
 9818  9819 -9820  259 -9821 0
 9818  9819 -9820  259 -9822 0
 9818  9819 -9820  259 -9823 0

c  0-1 --> -1
c    (-b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧ -p_259) -> ( b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0)
c  in CNF:
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨  b^{7, 38}_2
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_1
c     b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨  b^{7, 38}_0
c  in DIMACS:
 9818  9819  9820  259  9821 0
 9818  9819  9820  259 -9822 0
 9818  9819  9820  259  9823 0

c  -1-1 --> -2
c    ( b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧  b^{7, 37}_0 ∧ -p_259) -> ( b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0)
c  in CNF:
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨  b^{7, 38}_2
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨  b^{7, 38}_1
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨  p_259 ∨ -b^{7, 38}_0
c  in DIMACS:
-9818  9819 -9820  259  9821 0
-9818  9819 -9820  259  9822 0
-9818  9819 -9820  259 -9823 0

c  -2-1 --> break 
c    ( b^{7, 37}_2 ∧  b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧ -p_259) -> break
c  in CNF:
c    -b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨  b^{7, 37}_0 ∨  p_259 ∨ break
c  in DIMACS:
-9818 -9819  9820  259 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 37}_2 ∧ -b^{7, 37}_1 ∧ -b^{7, 37}_0 ∧ true) 
c  in CNF:
c    -b^{7, 37}_2 ∨  b^{7, 37}_1 ∨  b^{7, 37}_0 ∨ false 
c  in DIMACS:
-9818  9819  9820  0

c  3 does not represent an automaton state.
c    -(-b^{7, 37}_2 ∧  b^{7, 37}_1 ∧  b^{7, 37}_0 ∧ true) 
c  in CNF:
c     b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ false 
c  in DIMACS:
 9818 -9819 -9820  0
c  -3 does not represent an automaton state.
c    -( b^{7, 37}_2 ∧  b^{7, 37}_1 ∧  b^{7, 37}_0 ∧ true) 
c  in CNF:
c    -b^{7, 37}_2 ∨ -b^{7, 37}_1 ∨ -b^{7, 37}_0 ∨ false 
c  in DIMACS:
-9818 -9819 -9820  0

c i = 38
c  -2+1 --> -1
c    ( b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧  p_266) -> ( b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0)
c  in CNF:
c    -b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨  b^{7, 39}_2
c    -b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_1
c    -b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨  b^{7, 39}_0
c  in DIMACS:
-9821 -9822  9823 -266  9824 0
-9821 -9822  9823 -266 -9825 0
-9821 -9822  9823 -266  9826 0

c  -1+1 --> 0
c    ( b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0 ∧  p_266) -> (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧ -b^{7, 39}_0)
c  in CNF:
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_2
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_1
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_0
c  in DIMACS:
-9821  9822 -9823 -266 -9824 0
-9821  9822 -9823 -266 -9825 0
-9821  9822 -9823 -266 -9826 0

c  0+1 --> 1
c    (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧  p_266) -> (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0)
c  in CNF:
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_2
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_1
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨  b^{7, 39}_0
c  in DIMACS:
 9821  9822  9823 -266 -9824 0
 9821  9822  9823 -266 -9825 0
 9821  9822  9823 -266  9826 0

c  1+1 --> 2
c    (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0 ∧  p_266) -> (-b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0)
c  in CNF:
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_2
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨  b^{7, 39}_1
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ -p_266 ∨ -b^{7, 39}_0
c  in DIMACS:
 9821  9822 -9823 -266 -9824 0
 9821  9822 -9823 -266  9825 0
 9821  9822 -9823 -266 -9826 0

c  2+1 --> break 
c    (-b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧  p_266) -> break
c  in CNF:
c     b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 9821 -9822  9823 -266 1162 0


c  2-1 --> 1
c    (-b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧ -p_266) -> (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0)
c  in CNF:
c     b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_2
c     b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_1
c     b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨  b^{7, 39}_0
c  in DIMACS:
 9821 -9822  9823  266 -9824 0
 9821 -9822  9823  266 -9825 0
 9821 -9822  9823  266  9826 0

c  1-1 --> 0
c    (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0 ∧ -p_266) -> (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧ -b^{7, 39}_0)
c  in CNF:
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_2
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_1
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_0
c  in DIMACS:
 9821  9822 -9823  266 -9824 0
 9821  9822 -9823  266 -9825 0
 9821  9822 -9823  266 -9826 0

c  0-1 --> -1
c    (-b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧ -p_266) -> ( b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0)
c  in CNF:
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨  b^{7, 39}_2
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_1
c     b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨  b^{7, 39}_0
c  in DIMACS:
 9821  9822  9823  266  9824 0
 9821  9822  9823  266 -9825 0
 9821  9822  9823  266  9826 0

c  -1-1 --> -2
c    ( b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧  b^{7, 38}_0 ∧ -p_266) -> ( b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0)
c  in CNF:
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨  b^{7, 39}_2
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨  b^{7, 39}_1
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨  p_266 ∨ -b^{7, 39}_0
c  in DIMACS:
-9821  9822 -9823  266  9824 0
-9821  9822 -9823  266  9825 0
-9821  9822 -9823  266 -9826 0

c  -2-1 --> break 
c    ( b^{7, 38}_2 ∧  b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨  b^{7, 38}_0 ∨  p_266 ∨ break
c  in DIMACS:
-9821 -9822  9823  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 38}_2 ∧ -b^{7, 38}_1 ∧ -b^{7, 38}_0 ∧ true) 
c  in CNF:
c    -b^{7, 38}_2 ∨  b^{7, 38}_1 ∨  b^{7, 38}_0 ∨ false 
c  in DIMACS:
-9821  9822  9823  0

c  3 does not represent an automaton state.
c    -(-b^{7, 38}_2 ∧  b^{7, 38}_1 ∧  b^{7, 38}_0 ∧ true) 
c  in CNF:
c     b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ false 
c  in DIMACS:
 9821 -9822 -9823  0
c  -3 does not represent an automaton state.
c    -( b^{7, 38}_2 ∧  b^{7, 38}_1 ∧  b^{7, 38}_0 ∧ true) 
c  in CNF:
c    -b^{7, 38}_2 ∨ -b^{7, 38}_1 ∨ -b^{7, 38}_0 ∨ false 
c  in DIMACS:
-9821 -9822 -9823  0

c i = 39
c  -2+1 --> -1
c    ( b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧  p_273) -> ( b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0)
c  in CNF:
c    -b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨  b^{7, 40}_2
c    -b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_1
c    -b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨  b^{7, 40}_0
c  in DIMACS:
-9824 -9825  9826 -273  9827 0
-9824 -9825  9826 -273 -9828 0
-9824 -9825  9826 -273  9829 0

c  -1+1 --> 0
c    ( b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0 ∧  p_273) -> (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧ -b^{7, 40}_0)
c  in CNF:
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_2
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_1
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_0
c  in DIMACS:
-9824  9825 -9826 -273 -9827 0
-9824  9825 -9826 -273 -9828 0
-9824  9825 -9826 -273 -9829 0

c  0+1 --> 1
c    (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧  p_273) -> (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0)
c  in CNF:
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_2
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_1
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨  b^{7, 40}_0
c  in DIMACS:
 9824  9825  9826 -273 -9827 0
 9824  9825  9826 -273 -9828 0
 9824  9825  9826 -273  9829 0

c  1+1 --> 2
c    (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0 ∧  p_273) -> (-b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0)
c  in CNF:
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_2
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨  b^{7, 40}_1
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ -p_273 ∨ -b^{7, 40}_0
c  in DIMACS:
 9824  9825 -9826 -273 -9827 0
 9824  9825 -9826 -273  9828 0
 9824  9825 -9826 -273 -9829 0

c  2+1 --> break 
c    (-b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧  p_273) -> break
c  in CNF:
c     b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 9824 -9825  9826 -273 1162 0


c  2-1 --> 1
c    (-b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧ -p_273) -> (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0)
c  in CNF:
c     b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_2
c     b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_1
c     b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨  b^{7, 40}_0
c  in DIMACS:
 9824 -9825  9826  273 -9827 0
 9824 -9825  9826  273 -9828 0
 9824 -9825  9826  273  9829 0

c  1-1 --> 0
c    (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0 ∧ -p_273) -> (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧ -b^{7, 40}_0)
c  in CNF:
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_2
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_1
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_0
c  in DIMACS:
 9824  9825 -9826  273 -9827 0
 9824  9825 -9826  273 -9828 0
 9824  9825 -9826  273 -9829 0

c  0-1 --> -1
c    (-b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧ -p_273) -> ( b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0)
c  in CNF:
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨  b^{7, 40}_2
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_1
c     b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨  b^{7, 40}_0
c  in DIMACS:
 9824  9825  9826  273  9827 0
 9824  9825  9826  273 -9828 0
 9824  9825  9826  273  9829 0

c  -1-1 --> -2
c    ( b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧  b^{7, 39}_0 ∧ -p_273) -> ( b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0)
c  in CNF:
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨  b^{7, 40}_2
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨  b^{7, 40}_1
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨  p_273 ∨ -b^{7, 40}_0
c  in DIMACS:
-9824  9825 -9826  273  9827 0
-9824  9825 -9826  273  9828 0
-9824  9825 -9826  273 -9829 0

c  -2-1 --> break 
c    ( b^{7, 39}_2 ∧  b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨  b^{7, 39}_0 ∨  p_273 ∨ break
c  in DIMACS:
-9824 -9825  9826  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 39}_2 ∧ -b^{7, 39}_1 ∧ -b^{7, 39}_0 ∧ true) 
c  in CNF:
c    -b^{7, 39}_2 ∨  b^{7, 39}_1 ∨  b^{7, 39}_0 ∨ false 
c  in DIMACS:
-9824  9825  9826  0

c  3 does not represent an automaton state.
c    -(-b^{7, 39}_2 ∧  b^{7, 39}_1 ∧  b^{7, 39}_0 ∧ true) 
c  in CNF:
c     b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ false 
c  in DIMACS:
 9824 -9825 -9826  0
c  -3 does not represent an automaton state.
c    -( b^{7, 39}_2 ∧  b^{7, 39}_1 ∧  b^{7, 39}_0 ∧ true) 
c  in CNF:
c    -b^{7, 39}_2 ∨ -b^{7, 39}_1 ∨ -b^{7, 39}_0 ∨ false 
c  in DIMACS:
-9824 -9825 -9826  0

c i = 40
c  -2+1 --> -1
c    ( b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧  p_280) -> ( b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0)
c  in CNF:
c    -b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨  b^{7, 41}_2
c    -b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_1
c    -b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨  b^{7, 41}_0
c  in DIMACS:
-9827 -9828  9829 -280  9830 0
-9827 -9828  9829 -280 -9831 0
-9827 -9828  9829 -280  9832 0

c  -1+1 --> 0
c    ( b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0 ∧  p_280) -> (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧ -b^{7, 41}_0)
c  in CNF:
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_2
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_1
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_0
c  in DIMACS:
-9827  9828 -9829 -280 -9830 0
-9827  9828 -9829 -280 -9831 0
-9827  9828 -9829 -280 -9832 0

c  0+1 --> 1
c    (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧  p_280) -> (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0)
c  in CNF:
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_2
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_1
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨  b^{7, 41}_0
c  in DIMACS:
 9827  9828  9829 -280 -9830 0
 9827  9828  9829 -280 -9831 0
 9827  9828  9829 -280  9832 0

c  1+1 --> 2
c    (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0 ∧  p_280) -> (-b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0)
c  in CNF:
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_2
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨  b^{7, 41}_1
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ -p_280 ∨ -b^{7, 41}_0
c  in DIMACS:
 9827  9828 -9829 -280 -9830 0
 9827  9828 -9829 -280  9831 0
 9827  9828 -9829 -280 -9832 0

c  2+1 --> break 
c    (-b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧  p_280) -> break
c  in CNF:
c     b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 9827 -9828  9829 -280 1162 0


c  2-1 --> 1
c    (-b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧ -p_280) -> (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0)
c  in CNF:
c     b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_2
c     b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_1
c     b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨  b^{7, 41}_0
c  in DIMACS:
 9827 -9828  9829  280 -9830 0
 9827 -9828  9829  280 -9831 0
 9827 -9828  9829  280  9832 0

c  1-1 --> 0
c    (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0 ∧ -p_280) -> (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧ -b^{7, 41}_0)
c  in CNF:
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_2
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_1
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_0
c  in DIMACS:
 9827  9828 -9829  280 -9830 0
 9827  9828 -9829  280 -9831 0
 9827  9828 -9829  280 -9832 0

c  0-1 --> -1
c    (-b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧ -p_280) -> ( b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0)
c  in CNF:
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨  b^{7, 41}_2
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_1
c     b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨  b^{7, 41}_0
c  in DIMACS:
 9827  9828  9829  280  9830 0
 9827  9828  9829  280 -9831 0
 9827  9828  9829  280  9832 0

c  -1-1 --> -2
c    ( b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧  b^{7, 40}_0 ∧ -p_280) -> ( b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0)
c  in CNF:
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨  b^{7, 41}_2
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨  b^{7, 41}_1
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨  p_280 ∨ -b^{7, 41}_0
c  in DIMACS:
-9827  9828 -9829  280  9830 0
-9827  9828 -9829  280  9831 0
-9827  9828 -9829  280 -9832 0

c  -2-1 --> break 
c    ( b^{7, 40}_2 ∧  b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨  b^{7, 40}_0 ∨  p_280 ∨ break
c  in DIMACS:
-9827 -9828  9829  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 40}_2 ∧ -b^{7, 40}_1 ∧ -b^{7, 40}_0 ∧ true) 
c  in CNF:
c    -b^{7, 40}_2 ∨  b^{7, 40}_1 ∨  b^{7, 40}_0 ∨ false 
c  in DIMACS:
-9827  9828  9829  0

c  3 does not represent an automaton state.
c    -(-b^{7, 40}_2 ∧  b^{7, 40}_1 ∧  b^{7, 40}_0 ∧ true) 
c  in CNF:
c     b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ false 
c  in DIMACS:
 9827 -9828 -9829  0
c  -3 does not represent an automaton state.
c    -( b^{7, 40}_2 ∧  b^{7, 40}_1 ∧  b^{7, 40}_0 ∧ true) 
c  in CNF:
c    -b^{7, 40}_2 ∨ -b^{7, 40}_1 ∨ -b^{7, 40}_0 ∨ false 
c  in DIMACS:
-9827 -9828 -9829  0

c i = 41
c  -2+1 --> -1
c    ( b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧  p_287) -> ( b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0)
c  in CNF:
c    -b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨  b^{7, 42}_2
c    -b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_1
c    -b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨  b^{7, 42}_0
c  in DIMACS:
-9830 -9831  9832 -287  9833 0
-9830 -9831  9832 -287 -9834 0
-9830 -9831  9832 -287  9835 0

c  -1+1 --> 0
c    ( b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0 ∧  p_287) -> (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧ -b^{7, 42}_0)
c  in CNF:
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_2
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_1
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_0
c  in DIMACS:
-9830  9831 -9832 -287 -9833 0
-9830  9831 -9832 -287 -9834 0
-9830  9831 -9832 -287 -9835 0

c  0+1 --> 1
c    (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧  p_287) -> (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0)
c  in CNF:
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_2
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_1
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨  b^{7, 42}_0
c  in DIMACS:
 9830  9831  9832 -287 -9833 0
 9830  9831  9832 -287 -9834 0
 9830  9831  9832 -287  9835 0

c  1+1 --> 2
c    (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0 ∧  p_287) -> (-b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0)
c  in CNF:
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_2
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨  b^{7, 42}_1
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ -p_287 ∨ -b^{7, 42}_0
c  in DIMACS:
 9830  9831 -9832 -287 -9833 0
 9830  9831 -9832 -287  9834 0
 9830  9831 -9832 -287 -9835 0

c  2+1 --> break 
c    (-b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧  p_287) -> break
c  in CNF:
c     b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ -p_287 ∨ break
c  in DIMACS:
 9830 -9831  9832 -287 1162 0


c  2-1 --> 1
c    (-b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧ -p_287) -> (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0)
c  in CNF:
c     b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_2
c     b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_1
c     b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨  b^{7, 42}_0
c  in DIMACS:
 9830 -9831  9832  287 -9833 0
 9830 -9831  9832  287 -9834 0
 9830 -9831  9832  287  9835 0

c  1-1 --> 0
c    (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0 ∧ -p_287) -> (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧ -b^{7, 42}_0)
c  in CNF:
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_2
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_1
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_0
c  in DIMACS:
 9830  9831 -9832  287 -9833 0
 9830  9831 -9832  287 -9834 0
 9830  9831 -9832  287 -9835 0

c  0-1 --> -1
c    (-b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧ -p_287) -> ( b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0)
c  in CNF:
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨  b^{7, 42}_2
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_1
c     b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨  b^{7, 42}_0
c  in DIMACS:
 9830  9831  9832  287  9833 0
 9830  9831  9832  287 -9834 0
 9830  9831  9832  287  9835 0

c  -1-1 --> -2
c    ( b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧  b^{7, 41}_0 ∧ -p_287) -> ( b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0)
c  in CNF:
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨  b^{7, 42}_2
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨  b^{7, 42}_1
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨  p_287 ∨ -b^{7, 42}_0
c  in DIMACS:
-9830  9831 -9832  287  9833 0
-9830  9831 -9832  287  9834 0
-9830  9831 -9832  287 -9835 0

c  -2-1 --> break 
c    ( b^{7, 41}_2 ∧  b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧ -p_287) -> break
c  in CNF:
c    -b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨  b^{7, 41}_0 ∨  p_287 ∨ break
c  in DIMACS:
-9830 -9831  9832  287 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 41}_2 ∧ -b^{7, 41}_1 ∧ -b^{7, 41}_0 ∧ true) 
c  in CNF:
c    -b^{7, 41}_2 ∨  b^{7, 41}_1 ∨  b^{7, 41}_0 ∨ false 
c  in DIMACS:
-9830  9831  9832  0

c  3 does not represent an automaton state.
c    -(-b^{7, 41}_2 ∧  b^{7, 41}_1 ∧  b^{7, 41}_0 ∧ true) 
c  in CNF:
c     b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ false 
c  in DIMACS:
 9830 -9831 -9832  0
c  -3 does not represent an automaton state.
c    -( b^{7, 41}_2 ∧  b^{7, 41}_1 ∧  b^{7, 41}_0 ∧ true) 
c  in CNF:
c    -b^{7, 41}_2 ∨ -b^{7, 41}_1 ∨ -b^{7, 41}_0 ∨ false 
c  in DIMACS:
-9830 -9831 -9832  0

c i = 42
c  -2+1 --> -1
c    ( b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧  p_294) -> ( b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0)
c  in CNF:
c    -b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨  b^{7, 43}_2
c    -b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_1
c    -b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨  b^{7, 43}_0
c  in DIMACS:
-9833 -9834  9835 -294  9836 0
-9833 -9834  9835 -294 -9837 0
-9833 -9834  9835 -294  9838 0

c  -1+1 --> 0
c    ( b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0 ∧  p_294) -> (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧ -b^{7, 43}_0)
c  in CNF:
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_2
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_1
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_0
c  in DIMACS:
-9833  9834 -9835 -294 -9836 0
-9833  9834 -9835 -294 -9837 0
-9833  9834 -9835 -294 -9838 0

c  0+1 --> 1
c    (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧  p_294) -> (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0)
c  in CNF:
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_2
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_1
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨  b^{7, 43}_0
c  in DIMACS:
 9833  9834  9835 -294 -9836 0
 9833  9834  9835 -294 -9837 0
 9833  9834  9835 -294  9838 0

c  1+1 --> 2
c    (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0 ∧  p_294) -> (-b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0)
c  in CNF:
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_2
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨  b^{7, 43}_1
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ -p_294 ∨ -b^{7, 43}_0
c  in DIMACS:
 9833  9834 -9835 -294 -9836 0
 9833  9834 -9835 -294  9837 0
 9833  9834 -9835 -294 -9838 0

c  2+1 --> break 
c    (-b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧  p_294) -> break
c  in CNF:
c     b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 9833 -9834  9835 -294 1162 0


c  2-1 --> 1
c    (-b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧ -p_294) -> (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0)
c  in CNF:
c     b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_2
c     b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_1
c     b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨  b^{7, 43}_0
c  in DIMACS:
 9833 -9834  9835  294 -9836 0
 9833 -9834  9835  294 -9837 0
 9833 -9834  9835  294  9838 0

c  1-1 --> 0
c    (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0 ∧ -p_294) -> (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧ -b^{7, 43}_0)
c  in CNF:
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_2
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_1
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_0
c  in DIMACS:
 9833  9834 -9835  294 -9836 0
 9833  9834 -9835  294 -9837 0
 9833  9834 -9835  294 -9838 0

c  0-1 --> -1
c    (-b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧ -p_294) -> ( b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0)
c  in CNF:
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨  b^{7, 43}_2
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_1
c     b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨  b^{7, 43}_0
c  in DIMACS:
 9833  9834  9835  294  9836 0
 9833  9834  9835  294 -9837 0
 9833  9834  9835  294  9838 0

c  -1-1 --> -2
c    ( b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧  b^{7, 42}_0 ∧ -p_294) -> ( b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0)
c  in CNF:
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨  b^{7, 43}_2
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨  b^{7, 43}_1
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨  p_294 ∨ -b^{7, 43}_0
c  in DIMACS:
-9833  9834 -9835  294  9836 0
-9833  9834 -9835  294  9837 0
-9833  9834 -9835  294 -9838 0

c  -2-1 --> break 
c    ( b^{7, 42}_2 ∧  b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨  b^{7, 42}_0 ∨  p_294 ∨ break
c  in DIMACS:
-9833 -9834  9835  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 42}_2 ∧ -b^{7, 42}_1 ∧ -b^{7, 42}_0 ∧ true) 
c  in CNF:
c    -b^{7, 42}_2 ∨  b^{7, 42}_1 ∨  b^{7, 42}_0 ∨ false 
c  in DIMACS:
-9833  9834  9835  0

c  3 does not represent an automaton state.
c    -(-b^{7, 42}_2 ∧  b^{7, 42}_1 ∧  b^{7, 42}_0 ∧ true) 
c  in CNF:
c     b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ false 
c  in DIMACS:
 9833 -9834 -9835  0
c  -3 does not represent an automaton state.
c    -( b^{7, 42}_2 ∧  b^{7, 42}_1 ∧  b^{7, 42}_0 ∧ true) 
c  in CNF:
c    -b^{7, 42}_2 ∨ -b^{7, 42}_1 ∨ -b^{7, 42}_0 ∨ false 
c  in DIMACS:
-9833 -9834 -9835  0

c i = 43
c  -2+1 --> -1
c    ( b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧  p_301) -> ( b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0)
c  in CNF:
c    -b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨  b^{7, 44}_2
c    -b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_1
c    -b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨  b^{7, 44}_0
c  in DIMACS:
-9836 -9837  9838 -301  9839 0
-9836 -9837  9838 -301 -9840 0
-9836 -9837  9838 -301  9841 0

c  -1+1 --> 0
c    ( b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0 ∧  p_301) -> (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧ -b^{7, 44}_0)
c  in CNF:
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_2
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_1
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_0
c  in DIMACS:
-9836  9837 -9838 -301 -9839 0
-9836  9837 -9838 -301 -9840 0
-9836  9837 -9838 -301 -9841 0

c  0+1 --> 1
c    (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧  p_301) -> (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0)
c  in CNF:
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_2
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_1
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨  b^{7, 44}_0
c  in DIMACS:
 9836  9837  9838 -301 -9839 0
 9836  9837  9838 -301 -9840 0
 9836  9837  9838 -301  9841 0

c  1+1 --> 2
c    (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0 ∧  p_301) -> (-b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0)
c  in CNF:
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_2
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨  b^{7, 44}_1
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ -p_301 ∨ -b^{7, 44}_0
c  in DIMACS:
 9836  9837 -9838 -301 -9839 0
 9836  9837 -9838 -301  9840 0
 9836  9837 -9838 -301 -9841 0

c  2+1 --> break 
c    (-b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧  p_301) -> break
c  in CNF:
c     b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ -p_301 ∨ break
c  in DIMACS:
 9836 -9837  9838 -301 1162 0


c  2-1 --> 1
c    (-b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧ -p_301) -> (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0)
c  in CNF:
c     b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_2
c     b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_1
c     b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨  b^{7, 44}_0
c  in DIMACS:
 9836 -9837  9838  301 -9839 0
 9836 -9837  9838  301 -9840 0
 9836 -9837  9838  301  9841 0

c  1-1 --> 0
c    (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0 ∧ -p_301) -> (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧ -b^{7, 44}_0)
c  in CNF:
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_2
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_1
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_0
c  in DIMACS:
 9836  9837 -9838  301 -9839 0
 9836  9837 -9838  301 -9840 0
 9836  9837 -9838  301 -9841 0

c  0-1 --> -1
c    (-b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧ -p_301) -> ( b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0)
c  in CNF:
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨  b^{7, 44}_2
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_1
c     b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨  b^{7, 44}_0
c  in DIMACS:
 9836  9837  9838  301  9839 0
 9836  9837  9838  301 -9840 0
 9836  9837  9838  301  9841 0

c  -1-1 --> -2
c    ( b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧  b^{7, 43}_0 ∧ -p_301) -> ( b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0)
c  in CNF:
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨  b^{7, 44}_2
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨  b^{7, 44}_1
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨  p_301 ∨ -b^{7, 44}_0
c  in DIMACS:
-9836  9837 -9838  301  9839 0
-9836  9837 -9838  301  9840 0
-9836  9837 -9838  301 -9841 0

c  -2-1 --> break 
c    ( b^{7, 43}_2 ∧  b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧ -p_301) -> break
c  in CNF:
c    -b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨  b^{7, 43}_0 ∨  p_301 ∨ break
c  in DIMACS:
-9836 -9837  9838  301 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 43}_2 ∧ -b^{7, 43}_1 ∧ -b^{7, 43}_0 ∧ true) 
c  in CNF:
c    -b^{7, 43}_2 ∨  b^{7, 43}_1 ∨  b^{7, 43}_0 ∨ false 
c  in DIMACS:
-9836  9837  9838  0

c  3 does not represent an automaton state.
c    -(-b^{7, 43}_2 ∧  b^{7, 43}_1 ∧  b^{7, 43}_0 ∧ true) 
c  in CNF:
c     b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ false 
c  in DIMACS:
 9836 -9837 -9838  0
c  -3 does not represent an automaton state.
c    -( b^{7, 43}_2 ∧  b^{7, 43}_1 ∧  b^{7, 43}_0 ∧ true) 
c  in CNF:
c    -b^{7, 43}_2 ∨ -b^{7, 43}_1 ∨ -b^{7, 43}_0 ∨ false 
c  in DIMACS:
-9836 -9837 -9838  0

c i = 44
c  -2+1 --> -1
c    ( b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧  p_308) -> ( b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0)
c  in CNF:
c    -b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨  b^{7, 45}_2
c    -b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_1
c    -b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨  b^{7, 45}_0
c  in DIMACS:
-9839 -9840  9841 -308  9842 0
-9839 -9840  9841 -308 -9843 0
-9839 -9840  9841 -308  9844 0

c  -1+1 --> 0
c    ( b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0 ∧  p_308) -> (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧ -b^{7, 45}_0)
c  in CNF:
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_2
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_1
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_0
c  in DIMACS:
-9839  9840 -9841 -308 -9842 0
-9839  9840 -9841 -308 -9843 0
-9839  9840 -9841 -308 -9844 0

c  0+1 --> 1
c    (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧  p_308) -> (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0)
c  in CNF:
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_2
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_1
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨  b^{7, 45}_0
c  in DIMACS:
 9839  9840  9841 -308 -9842 0
 9839  9840  9841 -308 -9843 0
 9839  9840  9841 -308  9844 0

c  1+1 --> 2
c    (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0 ∧  p_308) -> (-b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0)
c  in CNF:
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_2
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨  b^{7, 45}_1
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ -p_308 ∨ -b^{7, 45}_0
c  in DIMACS:
 9839  9840 -9841 -308 -9842 0
 9839  9840 -9841 -308  9843 0
 9839  9840 -9841 -308 -9844 0

c  2+1 --> break 
c    (-b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧  p_308) -> break
c  in CNF:
c     b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 9839 -9840  9841 -308 1162 0


c  2-1 --> 1
c    (-b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧ -p_308) -> (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0)
c  in CNF:
c     b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_2
c     b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_1
c     b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨  b^{7, 45}_0
c  in DIMACS:
 9839 -9840  9841  308 -9842 0
 9839 -9840  9841  308 -9843 0
 9839 -9840  9841  308  9844 0

c  1-1 --> 0
c    (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0 ∧ -p_308) -> (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧ -b^{7, 45}_0)
c  in CNF:
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_2
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_1
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_0
c  in DIMACS:
 9839  9840 -9841  308 -9842 0
 9839  9840 -9841  308 -9843 0
 9839  9840 -9841  308 -9844 0

c  0-1 --> -1
c    (-b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧ -p_308) -> ( b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0)
c  in CNF:
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨  b^{7, 45}_2
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_1
c     b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨  b^{7, 45}_0
c  in DIMACS:
 9839  9840  9841  308  9842 0
 9839  9840  9841  308 -9843 0
 9839  9840  9841  308  9844 0

c  -1-1 --> -2
c    ( b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧  b^{7, 44}_0 ∧ -p_308) -> ( b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0)
c  in CNF:
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨  b^{7, 45}_2
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨  b^{7, 45}_1
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨  p_308 ∨ -b^{7, 45}_0
c  in DIMACS:
-9839  9840 -9841  308  9842 0
-9839  9840 -9841  308  9843 0
-9839  9840 -9841  308 -9844 0

c  -2-1 --> break 
c    ( b^{7, 44}_2 ∧  b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨  b^{7, 44}_0 ∨  p_308 ∨ break
c  in DIMACS:
-9839 -9840  9841  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 44}_2 ∧ -b^{7, 44}_1 ∧ -b^{7, 44}_0 ∧ true) 
c  in CNF:
c    -b^{7, 44}_2 ∨  b^{7, 44}_1 ∨  b^{7, 44}_0 ∨ false 
c  in DIMACS:
-9839  9840  9841  0

c  3 does not represent an automaton state.
c    -(-b^{7, 44}_2 ∧  b^{7, 44}_1 ∧  b^{7, 44}_0 ∧ true) 
c  in CNF:
c     b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ false 
c  in DIMACS:
 9839 -9840 -9841  0
c  -3 does not represent an automaton state.
c    -( b^{7, 44}_2 ∧  b^{7, 44}_1 ∧  b^{7, 44}_0 ∧ true) 
c  in CNF:
c    -b^{7, 44}_2 ∨ -b^{7, 44}_1 ∨ -b^{7, 44}_0 ∨ false 
c  in DIMACS:
-9839 -9840 -9841  0

c i = 45
c  -2+1 --> -1
c    ( b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧  p_315) -> ( b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0)
c  in CNF:
c    -b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨  b^{7, 46}_2
c    -b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_1
c    -b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨  b^{7, 46}_0
c  in DIMACS:
-9842 -9843  9844 -315  9845 0
-9842 -9843  9844 -315 -9846 0
-9842 -9843  9844 -315  9847 0

c  -1+1 --> 0
c    ( b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0 ∧  p_315) -> (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧ -b^{7, 46}_0)
c  in CNF:
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_2
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_1
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_0
c  in DIMACS:
-9842  9843 -9844 -315 -9845 0
-9842  9843 -9844 -315 -9846 0
-9842  9843 -9844 -315 -9847 0

c  0+1 --> 1
c    (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧  p_315) -> (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0)
c  in CNF:
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_2
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_1
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨  b^{7, 46}_0
c  in DIMACS:
 9842  9843  9844 -315 -9845 0
 9842  9843  9844 -315 -9846 0
 9842  9843  9844 -315  9847 0

c  1+1 --> 2
c    (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0 ∧  p_315) -> (-b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0)
c  in CNF:
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_2
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨  b^{7, 46}_1
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ -p_315 ∨ -b^{7, 46}_0
c  in DIMACS:
 9842  9843 -9844 -315 -9845 0
 9842  9843 -9844 -315  9846 0
 9842  9843 -9844 -315 -9847 0

c  2+1 --> break 
c    (-b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧  p_315) -> break
c  in CNF:
c     b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 9842 -9843  9844 -315 1162 0


c  2-1 --> 1
c    (-b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧ -p_315) -> (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0)
c  in CNF:
c     b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_2
c     b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_1
c     b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨  b^{7, 46}_0
c  in DIMACS:
 9842 -9843  9844  315 -9845 0
 9842 -9843  9844  315 -9846 0
 9842 -9843  9844  315  9847 0

c  1-1 --> 0
c    (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0 ∧ -p_315) -> (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧ -b^{7, 46}_0)
c  in CNF:
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_2
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_1
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_0
c  in DIMACS:
 9842  9843 -9844  315 -9845 0
 9842  9843 -9844  315 -9846 0
 9842  9843 -9844  315 -9847 0

c  0-1 --> -1
c    (-b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧ -p_315) -> ( b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0)
c  in CNF:
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨  b^{7, 46}_2
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_1
c     b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨  b^{7, 46}_0
c  in DIMACS:
 9842  9843  9844  315  9845 0
 9842  9843  9844  315 -9846 0
 9842  9843  9844  315  9847 0

c  -1-1 --> -2
c    ( b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧  b^{7, 45}_0 ∧ -p_315) -> ( b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0)
c  in CNF:
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨  b^{7, 46}_2
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨  b^{7, 46}_1
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨  p_315 ∨ -b^{7, 46}_0
c  in DIMACS:
-9842  9843 -9844  315  9845 0
-9842  9843 -9844  315  9846 0
-9842  9843 -9844  315 -9847 0

c  -2-1 --> break 
c    ( b^{7, 45}_2 ∧  b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨  b^{7, 45}_0 ∨  p_315 ∨ break
c  in DIMACS:
-9842 -9843  9844  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 45}_2 ∧ -b^{7, 45}_1 ∧ -b^{7, 45}_0 ∧ true) 
c  in CNF:
c    -b^{7, 45}_2 ∨  b^{7, 45}_1 ∨  b^{7, 45}_0 ∨ false 
c  in DIMACS:
-9842  9843  9844  0

c  3 does not represent an automaton state.
c    -(-b^{7, 45}_2 ∧  b^{7, 45}_1 ∧  b^{7, 45}_0 ∧ true) 
c  in CNF:
c     b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ false 
c  in DIMACS:
 9842 -9843 -9844  0
c  -3 does not represent an automaton state.
c    -( b^{7, 45}_2 ∧  b^{7, 45}_1 ∧  b^{7, 45}_0 ∧ true) 
c  in CNF:
c    -b^{7, 45}_2 ∨ -b^{7, 45}_1 ∨ -b^{7, 45}_0 ∨ false 
c  in DIMACS:
-9842 -9843 -9844  0

c i = 46
c  -2+1 --> -1
c    ( b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧  p_322) -> ( b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0)
c  in CNF:
c    -b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨  b^{7, 47}_2
c    -b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_1
c    -b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨  b^{7, 47}_0
c  in DIMACS:
-9845 -9846  9847 -322  9848 0
-9845 -9846  9847 -322 -9849 0
-9845 -9846  9847 -322  9850 0

c  -1+1 --> 0
c    ( b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0 ∧  p_322) -> (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧ -b^{7, 47}_0)
c  in CNF:
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_2
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_1
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_0
c  in DIMACS:
-9845  9846 -9847 -322 -9848 0
-9845  9846 -9847 -322 -9849 0
-9845  9846 -9847 -322 -9850 0

c  0+1 --> 1
c    (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧  p_322) -> (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0)
c  in CNF:
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_2
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_1
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨  b^{7, 47}_0
c  in DIMACS:
 9845  9846  9847 -322 -9848 0
 9845  9846  9847 -322 -9849 0
 9845  9846  9847 -322  9850 0

c  1+1 --> 2
c    (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0 ∧  p_322) -> (-b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0)
c  in CNF:
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_2
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨  b^{7, 47}_1
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ -p_322 ∨ -b^{7, 47}_0
c  in DIMACS:
 9845  9846 -9847 -322 -9848 0
 9845  9846 -9847 -322  9849 0
 9845  9846 -9847 -322 -9850 0

c  2+1 --> break 
c    (-b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧  p_322) -> break
c  in CNF:
c     b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 9845 -9846  9847 -322 1162 0


c  2-1 --> 1
c    (-b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧ -p_322) -> (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0)
c  in CNF:
c     b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_2
c     b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_1
c     b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨  b^{7, 47}_0
c  in DIMACS:
 9845 -9846  9847  322 -9848 0
 9845 -9846  9847  322 -9849 0
 9845 -9846  9847  322  9850 0

c  1-1 --> 0
c    (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0 ∧ -p_322) -> (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧ -b^{7, 47}_0)
c  in CNF:
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_2
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_1
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_0
c  in DIMACS:
 9845  9846 -9847  322 -9848 0
 9845  9846 -9847  322 -9849 0
 9845  9846 -9847  322 -9850 0

c  0-1 --> -1
c    (-b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧ -p_322) -> ( b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0)
c  in CNF:
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨  b^{7, 47}_2
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_1
c     b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨  b^{7, 47}_0
c  in DIMACS:
 9845  9846  9847  322  9848 0
 9845  9846  9847  322 -9849 0
 9845  9846  9847  322  9850 0

c  -1-1 --> -2
c    ( b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧  b^{7, 46}_0 ∧ -p_322) -> ( b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0)
c  in CNF:
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨  b^{7, 47}_2
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨  b^{7, 47}_1
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨  p_322 ∨ -b^{7, 47}_0
c  in DIMACS:
-9845  9846 -9847  322  9848 0
-9845  9846 -9847  322  9849 0
-9845  9846 -9847  322 -9850 0

c  -2-1 --> break 
c    ( b^{7, 46}_2 ∧  b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨  b^{7, 46}_0 ∨  p_322 ∨ break
c  in DIMACS:
-9845 -9846  9847  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 46}_2 ∧ -b^{7, 46}_1 ∧ -b^{7, 46}_0 ∧ true) 
c  in CNF:
c    -b^{7, 46}_2 ∨  b^{7, 46}_1 ∨  b^{7, 46}_0 ∨ false 
c  in DIMACS:
-9845  9846  9847  0

c  3 does not represent an automaton state.
c    -(-b^{7, 46}_2 ∧  b^{7, 46}_1 ∧  b^{7, 46}_0 ∧ true) 
c  in CNF:
c     b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ false 
c  in DIMACS:
 9845 -9846 -9847  0
c  -3 does not represent an automaton state.
c    -( b^{7, 46}_2 ∧  b^{7, 46}_1 ∧  b^{7, 46}_0 ∧ true) 
c  in CNF:
c    -b^{7, 46}_2 ∨ -b^{7, 46}_1 ∨ -b^{7, 46}_0 ∨ false 
c  in DIMACS:
-9845 -9846 -9847  0

c i = 47
c  -2+1 --> -1
c    ( b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧  p_329) -> ( b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0)
c  in CNF:
c    -b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨  b^{7, 48}_2
c    -b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_1
c    -b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨  b^{7, 48}_0
c  in DIMACS:
-9848 -9849  9850 -329  9851 0
-9848 -9849  9850 -329 -9852 0
-9848 -9849  9850 -329  9853 0

c  -1+1 --> 0
c    ( b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0 ∧  p_329) -> (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧ -b^{7, 48}_0)
c  in CNF:
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_2
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_1
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_0
c  in DIMACS:
-9848  9849 -9850 -329 -9851 0
-9848  9849 -9850 -329 -9852 0
-9848  9849 -9850 -329 -9853 0

c  0+1 --> 1
c    (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧  p_329) -> (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0)
c  in CNF:
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_2
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_1
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨  b^{7, 48}_0
c  in DIMACS:
 9848  9849  9850 -329 -9851 0
 9848  9849  9850 -329 -9852 0
 9848  9849  9850 -329  9853 0

c  1+1 --> 2
c    (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0 ∧  p_329) -> (-b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0)
c  in CNF:
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_2
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨  b^{7, 48}_1
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ -p_329 ∨ -b^{7, 48}_0
c  in DIMACS:
 9848  9849 -9850 -329 -9851 0
 9848  9849 -9850 -329  9852 0
 9848  9849 -9850 -329 -9853 0

c  2+1 --> break 
c    (-b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧  p_329) -> break
c  in CNF:
c     b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ -p_329 ∨ break
c  in DIMACS:
 9848 -9849  9850 -329 1162 0


c  2-1 --> 1
c    (-b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧ -p_329) -> (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0)
c  in CNF:
c     b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_2
c     b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_1
c     b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨  b^{7, 48}_0
c  in DIMACS:
 9848 -9849  9850  329 -9851 0
 9848 -9849  9850  329 -9852 0
 9848 -9849  9850  329  9853 0

c  1-1 --> 0
c    (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0 ∧ -p_329) -> (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧ -b^{7, 48}_0)
c  in CNF:
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_2
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_1
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_0
c  in DIMACS:
 9848  9849 -9850  329 -9851 0
 9848  9849 -9850  329 -9852 0
 9848  9849 -9850  329 -9853 0

c  0-1 --> -1
c    (-b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧ -p_329) -> ( b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0)
c  in CNF:
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨  b^{7, 48}_2
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_1
c     b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨  b^{7, 48}_0
c  in DIMACS:
 9848  9849  9850  329  9851 0
 9848  9849  9850  329 -9852 0
 9848  9849  9850  329  9853 0

c  -1-1 --> -2
c    ( b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧  b^{7, 47}_0 ∧ -p_329) -> ( b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0)
c  in CNF:
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨  b^{7, 48}_2
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨  b^{7, 48}_1
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨  p_329 ∨ -b^{7, 48}_0
c  in DIMACS:
-9848  9849 -9850  329  9851 0
-9848  9849 -9850  329  9852 0
-9848  9849 -9850  329 -9853 0

c  -2-1 --> break 
c    ( b^{7, 47}_2 ∧  b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧ -p_329) -> break
c  in CNF:
c    -b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨  b^{7, 47}_0 ∨  p_329 ∨ break
c  in DIMACS:
-9848 -9849  9850  329 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 47}_2 ∧ -b^{7, 47}_1 ∧ -b^{7, 47}_0 ∧ true) 
c  in CNF:
c    -b^{7, 47}_2 ∨  b^{7, 47}_1 ∨  b^{7, 47}_0 ∨ false 
c  in DIMACS:
-9848  9849  9850  0

c  3 does not represent an automaton state.
c    -(-b^{7, 47}_2 ∧  b^{7, 47}_1 ∧  b^{7, 47}_0 ∧ true) 
c  in CNF:
c     b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ false 
c  in DIMACS:
 9848 -9849 -9850  0
c  -3 does not represent an automaton state.
c    -( b^{7, 47}_2 ∧  b^{7, 47}_1 ∧  b^{7, 47}_0 ∧ true) 
c  in CNF:
c    -b^{7, 47}_2 ∨ -b^{7, 47}_1 ∨ -b^{7, 47}_0 ∨ false 
c  in DIMACS:
-9848 -9849 -9850  0

c i = 48
c  -2+1 --> -1
c    ( b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧  p_336) -> ( b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0)
c  in CNF:
c    -b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨  b^{7, 49}_2
c    -b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_1
c    -b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨  b^{7, 49}_0
c  in DIMACS:
-9851 -9852  9853 -336  9854 0
-9851 -9852  9853 -336 -9855 0
-9851 -9852  9853 -336  9856 0

c  -1+1 --> 0
c    ( b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0 ∧  p_336) -> (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧ -b^{7, 49}_0)
c  in CNF:
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_2
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_1
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_0
c  in DIMACS:
-9851  9852 -9853 -336 -9854 0
-9851  9852 -9853 -336 -9855 0
-9851  9852 -9853 -336 -9856 0

c  0+1 --> 1
c    (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧  p_336) -> (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0)
c  in CNF:
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_2
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_1
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨  b^{7, 49}_0
c  in DIMACS:
 9851  9852  9853 -336 -9854 0
 9851  9852  9853 -336 -9855 0
 9851  9852  9853 -336  9856 0

c  1+1 --> 2
c    (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0 ∧  p_336) -> (-b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0)
c  in CNF:
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_2
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨  b^{7, 49}_1
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ -p_336 ∨ -b^{7, 49}_0
c  in DIMACS:
 9851  9852 -9853 -336 -9854 0
 9851  9852 -9853 -336  9855 0
 9851  9852 -9853 -336 -9856 0

c  2+1 --> break 
c    (-b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧  p_336) -> break
c  in CNF:
c     b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 9851 -9852  9853 -336 1162 0


c  2-1 --> 1
c    (-b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧ -p_336) -> (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0)
c  in CNF:
c     b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_2
c     b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_1
c     b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨  b^{7, 49}_0
c  in DIMACS:
 9851 -9852  9853  336 -9854 0
 9851 -9852  9853  336 -9855 0
 9851 -9852  9853  336  9856 0

c  1-1 --> 0
c    (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0 ∧ -p_336) -> (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧ -b^{7, 49}_0)
c  in CNF:
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_2
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_1
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_0
c  in DIMACS:
 9851  9852 -9853  336 -9854 0
 9851  9852 -9853  336 -9855 0
 9851  9852 -9853  336 -9856 0

c  0-1 --> -1
c    (-b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧ -p_336) -> ( b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0)
c  in CNF:
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨  b^{7, 49}_2
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_1
c     b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨  b^{7, 49}_0
c  in DIMACS:
 9851  9852  9853  336  9854 0
 9851  9852  9853  336 -9855 0
 9851  9852  9853  336  9856 0

c  -1-1 --> -2
c    ( b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧  b^{7, 48}_0 ∧ -p_336) -> ( b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0)
c  in CNF:
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨  b^{7, 49}_2
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨  b^{7, 49}_1
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨  p_336 ∨ -b^{7, 49}_0
c  in DIMACS:
-9851  9852 -9853  336  9854 0
-9851  9852 -9853  336  9855 0
-9851  9852 -9853  336 -9856 0

c  -2-1 --> break 
c    ( b^{7, 48}_2 ∧  b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨  b^{7, 48}_0 ∨  p_336 ∨ break
c  in DIMACS:
-9851 -9852  9853  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 48}_2 ∧ -b^{7, 48}_1 ∧ -b^{7, 48}_0 ∧ true) 
c  in CNF:
c    -b^{7, 48}_2 ∨  b^{7, 48}_1 ∨  b^{7, 48}_0 ∨ false 
c  in DIMACS:
-9851  9852  9853  0

c  3 does not represent an automaton state.
c    -(-b^{7, 48}_2 ∧  b^{7, 48}_1 ∧  b^{7, 48}_0 ∧ true) 
c  in CNF:
c     b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ false 
c  in DIMACS:
 9851 -9852 -9853  0
c  -3 does not represent an automaton state.
c    -( b^{7, 48}_2 ∧  b^{7, 48}_1 ∧  b^{7, 48}_0 ∧ true) 
c  in CNF:
c    -b^{7, 48}_2 ∨ -b^{7, 48}_1 ∨ -b^{7, 48}_0 ∨ false 
c  in DIMACS:
-9851 -9852 -9853  0

c i = 49
c  -2+1 --> -1
c    ( b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧  p_343) -> ( b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0)
c  in CNF:
c    -b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨  b^{7, 50}_2
c    -b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_1
c    -b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨  b^{7, 50}_0
c  in DIMACS:
-9854 -9855  9856 -343  9857 0
-9854 -9855  9856 -343 -9858 0
-9854 -9855  9856 -343  9859 0

c  -1+1 --> 0
c    ( b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0 ∧  p_343) -> (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧ -b^{7, 50}_0)
c  in CNF:
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_2
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_1
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_0
c  in DIMACS:
-9854  9855 -9856 -343 -9857 0
-9854  9855 -9856 -343 -9858 0
-9854  9855 -9856 -343 -9859 0

c  0+1 --> 1
c    (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧  p_343) -> (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0)
c  in CNF:
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_2
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_1
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨  b^{7, 50}_0
c  in DIMACS:
 9854  9855  9856 -343 -9857 0
 9854  9855  9856 -343 -9858 0
 9854  9855  9856 -343  9859 0

c  1+1 --> 2
c    (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0 ∧  p_343) -> (-b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0)
c  in CNF:
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_2
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨  b^{7, 50}_1
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ -p_343 ∨ -b^{7, 50}_0
c  in DIMACS:
 9854  9855 -9856 -343 -9857 0
 9854  9855 -9856 -343  9858 0
 9854  9855 -9856 -343 -9859 0

c  2+1 --> break 
c    (-b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧  p_343) -> break
c  in CNF:
c     b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ -p_343 ∨ break
c  in DIMACS:
 9854 -9855  9856 -343 1162 0


c  2-1 --> 1
c    (-b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧ -p_343) -> (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0)
c  in CNF:
c     b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_2
c     b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_1
c     b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨  b^{7, 50}_0
c  in DIMACS:
 9854 -9855  9856  343 -9857 0
 9854 -9855  9856  343 -9858 0
 9854 -9855  9856  343  9859 0

c  1-1 --> 0
c    (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0 ∧ -p_343) -> (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧ -b^{7, 50}_0)
c  in CNF:
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_2
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_1
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_0
c  in DIMACS:
 9854  9855 -9856  343 -9857 0
 9854  9855 -9856  343 -9858 0
 9854  9855 -9856  343 -9859 0

c  0-1 --> -1
c    (-b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧ -p_343) -> ( b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0)
c  in CNF:
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨  b^{7, 50}_2
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_1
c     b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨  b^{7, 50}_0
c  in DIMACS:
 9854  9855  9856  343  9857 0
 9854  9855  9856  343 -9858 0
 9854  9855  9856  343  9859 0

c  -1-1 --> -2
c    ( b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧  b^{7, 49}_0 ∧ -p_343) -> ( b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0)
c  in CNF:
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨  b^{7, 50}_2
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨  b^{7, 50}_1
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨  p_343 ∨ -b^{7, 50}_0
c  in DIMACS:
-9854  9855 -9856  343  9857 0
-9854  9855 -9856  343  9858 0
-9854  9855 -9856  343 -9859 0

c  -2-1 --> break 
c    ( b^{7, 49}_2 ∧  b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧ -p_343) -> break
c  in CNF:
c    -b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨  b^{7, 49}_0 ∨  p_343 ∨ break
c  in DIMACS:
-9854 -9855  9856  343 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 49}_2 ∧ -b^{7, 49}_1 ∧ -b^{7, 49}_0 ∧ true) 
c  in CNF:
c    -b^{7, 49}_2 ∨  b^{7, 49}_1 ∨  b^{7, 49}_0 ∨ false 
c  in DIMACS:
-9854  9855  9856  0

c  3 does not represent an automaton state.
c    -(-b^{7, 49}_2 ∧  b^{7, 49}_1 ∧  b^{7, 49}_0 ∧ true) 
c  in CNF:
c     b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ false 
c  in DIMACS:
 9854 -9855 -9856  0
c  -3 does not represent an automaton state.
c    -( b^{7, 49}_2 ∧  b^{7, 49}_1 ∧  b^{7, 49}_0 ∧ true) 
c  in CNF:
c    -b^{7, 49}_2 ∨ -b^{7, 49}_1 ∨ -b^{7, 49}_0 ∨ false 
c  in DIMACS:
-9854 -9855 -9856  0

c i = 50
c  -2+1 --> -1
c    ( b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧  p_350) -> ( b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0)
c  in CNF:
c    -b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨  b^{7, 51}_2
c    -b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_1
c    -b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨  b^{7, 51}_0
c  in DIMACS:
-9857 -9858  9859 -350  9860 0
-9857 -9858  9859 -350 -9861 0
-9857 -9858  9859 -350  9862 0

c  -1+1 --> 0
c    ( b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0 ∧  p_350) -> (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧ -b^{7, 51}_0)
c  in CNF:
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_2
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_1
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_0
c  in DIMACS:
-9857  9858 -9859 -350 -9860 0
-9857  9858 -9859 -350 -9861 0
-9857  9858 -9859 -350 -9862 0

c  0+1 --> 1
c    (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧  p_350) -> (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0)
c  in CNF:
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_2
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_1
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨  b^{7, 51}_0
c  in DIMACS:
 9857  9858  9859 -350 -9860 0
 9857  9858  9859 -350 -9861 0
 9857  9858  9859 -350  9862 0

c  1+1 --> 2
c    (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0 ∧  p_350) -> (-b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0)
c  in CNF:
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_2
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨  b^{7, 51}_1
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ -p_350 ∨ -b^{7, 51}_0
c  in DIMACS:
 9857  9858 -9859 -350 -9860 0
 9857  9858 -9859 -350  9861 0
 9857  9858 -9859 -350 -9862 0

c  2+1 --> break 
c    (-b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧  p_350) -> break
c  in CNF:
c     b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 9857 -9858  9859 -350 1162 0


c  2-1 --> 1
c    (-b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧ -p_350) -> (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0)
c  in CNF:
c     b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_2
c     b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_1
c     b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨  b^{7, 51}_0
c  in DIMACS:
 9857 -9858  9859  350 -9860 0
 9857 -9858  9859  350 -9861 0
 9857 -9858  9859  350  9862 0

c  1-1 --> 0
c    (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0 ∧ -p_350) -> (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧ -b^{7, 51}_0)
c  in CNF:
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_2
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_1
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_0
c  in DIMACS:
 9857  9858 -9859  350 -9860 0
 9857  9858 -9859  350 -9861 0
 9857  9858 -9859  350 -9862 0

c  0-1 --> -1
c    (-b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧ -p_350) -> ( b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0)
c  in CNF:
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨  b^{7, 51}_2
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_1
c     b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨  b^{7, 51}_0
c  in DIMACS:
 9857  9858  9859  350  9860 0
 9857  9858  9859  350 -9861 0
 9857  9858  9859  350  9862 0

c  -1-1 --> -2
c    ( b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧  b^{7, 50}_0 ∧ -p_350) -> ( b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0)
c  in CNF:
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨  b^{7, 51}_2
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨  b^{7, 51}_1
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨  p_350 ∨ -b^{7, 51}_0
c  in DIMACS:
-9857  9858 -9859  350  9860 0
-9857  9858 -9859  350  9861 0
-9857  9858 -9859  350 -9862 0

c  -2-1 --> break 
c    ( b^{7, 50}_2 ∧  b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨  b^{7, 50}_0 ∨  p_350 ∨ break
c  in DIMACS:
-9857 -9858  9859  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 50}_2 ∧ -b^{7, 50}_1 ∧ -b^{7, 50}_0 ∧ true) 
c  in CNF:
c    -b^{7, 50}_2 ∨  b^{7, 50}_1 ∨  b^{7, 50}_0 ∨ false 
c  in DIMACS:
-9857  9858  9859  0

c  3 does not represent an automaton state.
c    -(-b^{7, 50}_2 ∧  b^{7, 50}_1 ∧  b^{7, 50}_0 ∧ true) 
c  in CNF:
c     b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ false 
c  in DIMACS:
 9857 -9858 -9859  0
c  -3 does not represent an automaton state.
c    -( b^{7, 50}_2 ∧  b^{7, 50}_1 ∧  b^{7, 50}_0 ∧ true) 
c  in CNF:
c    -b^{7, 50}_2 ∨ -b^{7, 50}_1 ∨ -b^{7, 50}_0 ∨ false 
c  in DIMACS:
-9857 -9858 -9859  0

c i = 51
c  -2+1 --> -1
c    ( b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧  p_357) -> ( b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0)
c  in CNF:
c    -b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨  b^{7, 52}_2
c    -b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_1
c    -b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨  b^{7, 52}_0
c  in DIMACS:
-9860 -9861  9862 -357  9863 0
-9860 -9861  9862 -357 -9864 0
-9860 -9861  9862 -357  9865 0

c  -1+1 --> 0
c    ( b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0 ∧  p_357) -> (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧ -b^{7, 52}_0)
c  in CNF:
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_2
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_1
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_0
c  in DIMACS:
-9860  9861 -9862 -357 -9863 0
-9860  9861 -9862 -357 -9864 0
-9860  9861 -9862 -357 -9865 0

c  0+1 --> 1
c    (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧  p_357) -> (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0)
c  in CNF:
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_2
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_1
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨  b^{7, 52}_0
c  in DIMACS:
 9860  9861  9862 -357 -9863 0
 9860  9861  9862 -357 -9864 0
 9860  9861  9862 -357  9865 0

c  1+1 --> 2
c    (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0 ∧  p_357) -> (-b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0)
c  in CNF:
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_2
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨  b^{7, 52}_1
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ -p_357 ∨ -b^{7, 52}_0
c  in DIMACS:
 9860  9861 -9862 -357 -9863 0
 9860  9861 -9862 -357  9864 0
 9860  9861 -9862 -357 -9865 0

c  2+1 --> break 
c    (-b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧  p_357) -> break
c  in CNF:
c     b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 9860 -9861  9862 -357 1162 0


c  2-1 --> 1
c    (-b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧ -p_357) -> (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0)
c  in CNF:
c     b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_2
c     b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_1
c     b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨  b^{7, 52}_0
c  in DIMACS:
 9860 -9861  9862  357 -9863 0
 9860 -9861  9862  357 -9864 0
 9860 -9861  9862  357  9865 0

c  1-1 --> 0
c    (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0 ∧ -p_357) -> (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧ -b^{7, 52}_0)
c  in CNF:
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_2
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_1
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_0
c  in DIMACS:
 9860  9861 -9862  357 -9863 0
 9860  9861 -9862  357 -9864 0
 9860  9861 -9862  357 -9865 0

c  0-1 --> -1
c    (-b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧ -p_357) -> ( b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0)
c  in CNF:
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨  b^{7, 52}_2
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_1
c     b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨  b^{7, 52}_0
c  in DIMACS:
 9860  9861  9862  357  9863 0
 9860  9861  9862  357 -9864 0
 9860  9861  9862  357  9865 0

c  -1-1 --> -2
c    ( b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧  b^{7, 51}_0 ∧ -p_357) -> ( b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0)
c  in CNF:
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨  b^{7, 52}_2
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨  b^{7, 52}_1
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨  p_357 ∨ -b^{7, 52}_0
c  in DIMACS:
-9860  9861 -9862  357  9863 0
-9860  9861 -9862  357  9864 0
-9860  9861 -9862  357 -9865 0

c  -2-1 --> break 
c    ( b^{7, 51}_2 ∧  b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨  b^{7, 51}_0 ∨  p_357 ∨ break
c  in DIMACS:
-9860 -9861  9862  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 51}_2 ∧ -b^{7, 51}_1 ∧ -b^{7, 51}_0 ∧ true) 
c  in CNF:
c    -b^{7, 51}_2 ∨  b^{7, 51}_1 ∨  b^{7, 51}_0 ∨ false 
c  in DIMACS:
-9860  9861  9862  0

c  3 does not represent an automaton state.
c    -(-b^{7, 51}_2 ∧  b^{7, 51}_1 ∧  b^{7, 51}_0 ∧ true) 
c  in CNF:
c     b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ false 
c  in DIMACS:
 9860 -9861 -9862  0
c  -3 does not represent an automaton state.
c    -( b^{7, 51}_2 ∧  b^{7, 51}_1 ∧  b^{7, 51}_0 ∧ true) 
c  in CNF:
c    -b^{7, 51}_2 ∨ -b^{7, 51}_1 ∨ -b^{7, 51}_0 ∨ false 
c  in DIMACS:
-9860 -9861 -9862  0

c i = 52
c  -2+1 --> -1
c    ( b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧  p_364) -> ( b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0)
c  in CNF:
c    -b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨  b^{7, 53}_2
c    -b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_1
c    -b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨  b^{7, 53}_0
c  in DIMACS:
-9863 -9864  9865 -364  9866 0
-9863 -9864  9865 -364 -9867 0
-9863 -9864  9865 -364  9868 0

c  -1+1 --> 0
c    ( b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0 ∧  p_364) -> (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧ -b^{7, 53}_0)
c  in CNF:
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_2
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_1
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_0
c  in DIMACS:
-9863  9864 -9865 -364 -9866 0
-9863  9864 -9865 -364 -9867 0
-9863  9864 -9865 -364 -9868 0

c  0+1 --> 1
c    (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧  p_364) -> (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0)
c  in CNF:
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_2
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_1
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨  b^{7, 53}_0
c  in DIMACS:
 9863  9864  9865 -364 -9866 0
 9863  9864  9865 -364 -9867 0
 9863  9864  9865 -364  9868 0

c  1+1 --> 2
c    (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0 ∧  p_364) -> (-b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0)
c  in CNF:
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_2
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨  b^{7, 53}_1
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ -p_364 ∨ -b^{7, 53}_0
c  in DIMACS:
 9863  9864 -9865 -364 -9866 0
 9863  9864 -9865 -364  9867 0
 9863  9864 -9865 -364 -9868 0

c  2+1 --> break 
c    (-b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧  p_364) -> break
c  in CNF:
c     b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 9863 -9864  9865 -364 1162 0


c  2-1 --> 1
c    (-b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧ -p_364) -> (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0)
c  in CNF:
c     b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_2
c     b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_1
c     b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨  b^{7, 53}_0
c  in DIMACS:
 9863 -9864  9865  364 -9866 0
 9863 -9864  9865  364 -9867 0
 9863 -9864  9865  364  9868 0

c  1-1 --> 0
c    (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0 ∧ -p_364) -> (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧ -b^{7, 53}_0)
c  in CNF:
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_2
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_1
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_0
c  in DIMACS:
 9863  9864 -9865  364 -9866 0
 9863  9864 -9865  364 -9867 0
 9863  9864 -9865  364 -9868 0

c  0-1 --> -1
c    (-b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧ -p_364) -> ( b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0)
c  in CNF:
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨  b^{7, 53}_2
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_1
c     b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨  b^{7, 53}_0
c  in DIMACS:
 9863  9864  9865  364  9866 0
 9863  9864  9865  364 -9867 0
 9863  9864  9865  364  9868 0

c  -1-1 --> -2
c    ( b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧  b^{7, 52}_0 ∧ -p_364) -> ( b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0)
c  in CNF:
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨  b^{7, 53}_2
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨  b^{7, 53}_1
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨  p_364 ∨ -b^{7, 53}_0
c  in DIMACS:
-9863  9864 -9865  364  9866 0
-9863  9864 -9865  364  9867 0
-9863  9864 -9865  364 -9868 0

c  -2-1 --> break 
c    ( b^{7, 52}_2 ∧  b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨  b^{7, 52}_0 ∨  p_364 ∨ break
c  in DIMACS:
-9863 -9864  9865  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 52}_2 ∧ -b^{7, 52}_1 ∧ -b^{7, 52}_0 ∧ true) 
c  in CNF:
c    -b^{7, 52}_2 ∨  b^{7, 52}_1 ∨  b^{7, 52}_0 ∨ false 
c  in DIMACS:
-9863  9864  9865  0

c  3 does not represent an automaton state.
c    -(-b^{7, 52}_2 ∧  b^{7, 52}_1 ∧  b^{7, 52}_0 ∧ true) 
c  in CNF:
c     b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ false 
c  in DIMACS:
 9863 -9864 -9865  0
c  -3 does not represent an automaton state.
c    -( b^{7, 52}_2 ∧  b^{7, 52}_1 ∧  b^{7, 52}_0 ∧ true) 
c  in CNF:
c    -b^{7, 52}_2 ∨ -b^{7, 52}_1 ∨ -b^{7, 52}_0 ∨ false 
c  in DIMACS:
-9863 -9864 -9865  0

c i = 53
c  -2+1 --> -1
c    ( b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧  p_371) -> ( b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0)
c  in CNF:
c    -b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨  b^{7, 54}_2
c    -b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_1
c    -b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨  b^{7, 54}_0
c  in DIMACS:
-9866 -9867  9868 -371  9869 0
-9866 -9867  9868 -371 -9870 0
-9866 -9867  9868 -371  9871 0

c  -1+1 --> 0
c    ( b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0 ∧  p_371) -> (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧ -b^{7, 54}_0)
c  in CNF:
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_2
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_1
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_0
c  in DIMACS:
-9866  9867 -9868 -371 -9869 0
-9866  9867 -9868 -371 -9870 0
-9866  9867 -9868 -371 -9871 0

c  0+1 --> 1
c    (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧  p_371) -> (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0)
c  in CNF:
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_2
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_1
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨  b^{7, 54}_0
c  in DIMACS:
 9866  9867  9868 -371 -9869 0
 9866  9867  9868 -371 -9870 0
 9866  9867  9868 -371  9871 0

c  1+1 --> 2
c    (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0 ∧  p_371) -> (-b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0)
c  in CNF:
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_2
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨  b^{7, 54}_1
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ -p_371 ∨ -b^{7, 54}_0
c  in DIMACS:
 9866  9867 -9868 -371 -9869 0
 9866  9867 -9868 -371  9870 0
 9866  9867 -9868 -371 -9871 0

c  2+1 --> break 
c    (-b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧  p_371) -> break
c  in CNF:
c     b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ -p_371 ∨ break
c  in DIMACS:
 9866 -9867  9868 -371 1162 0


c  2-1 --> 1
c    (-b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧ -p_371) -> (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0)
c  in CNF:
c     b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_2
c     b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_1
c     b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨  b^{7, 54}_0
c  in DIMACS:
 9866 -9867  9868  371 -9869 0
 9866 -9867  9868  371 -9870 0
 9866 -9867  9868  371  9871 0

c  1-1 --> 0
c    (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0 ∧ -p_371) -> (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧ -b^{7, 54}_0)
c  in CNF:
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_2
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_1
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_0
c  in DIMACS:
 9866  9867 -9868  371 -9869 0
 9866  9867 -9868  371 -9870 0
 9866  9867 -9868  371 -9871 0

c  0-1 --> -1
c    (-b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧ -p_371) -> ( b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0)
c  in CNF:
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨  b^{7, 54}_2
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_1
c     b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨  b^{7, 54}_0
c  in DIMACS:
 9866  9867  9868  371  9869 0
 9866  9867  9868  371 -9870 0
 9866  9867  9868  371  9871 0

c  -1-1 --> -2
c    ( b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧  b^{7, 53}_0 ∧ -p_371) -> ( b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0)
c  in CNF:
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨  b^{7, 54}_2
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨  b^{7, 54}_1
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨  p_371 ∨ -b^{7, 54}_0
c  in DIMACS:
-9866  9867 -9868  371  9869 0
-9866  9867 -9868  371  9870 0
-9866  9867 -9868  371 -9871 0

c  -2-1 --> break 
c    ( b^{7, 53}_2 ∧  b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧ -p_371) -> break
c  in CNF:
c    -b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨  b^{7, 53}_0 ∨  p_371 ∨ break
c  in DIMACS:
-9866 -9867  9868  371 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 53}_2 ∧ -b^{7, 53}_1 ∧ -b^{7, 53}_0 ∧ true) 
c  in CNF:
c    -b^{7, 53}_2 ∨  b^{7, 53}_1 ∨  b^{7, 53}_0 ∨ false 
c  in DIMACS:
-9866  9867  9868  0

c  3 does not represent an automaton state.
c    -(-b^{7, 53}_2 ∧  b^{7, 53}_1 ∧  b^{7, 53}_0 ∧ true) 
c  in CNF:
c     b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ false 
c  in DIMACS:
 9866 -9867 -9868  0
c  -3 does not represent an automaton state.
c    -( b^{7, 53}_2 ∧  b^{7, 53}_1 ∧  b^{7, 53}_0 ∧ true) 
c  in CNF:
c    -b^{7, 53}_2 ∨ -b^{7, 53}_1 ∨ -b^{7, 53}_0 ∨ false 
c  in DIMACS:
-9866 -9867 -9868  0

c i = 54
c  -2+1 --> -1
c    ( b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧  p_378) -> ( b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0)
c  in CNF:
c    -b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨  b^{7, 55}_2
c    -b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_1
c    -b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨  b^{7, 55}_0
c  in DIMACS:
-9869 -9870  9871 -378  9872 0
-9869 -9870  9871 -378 -9873 0
-9869 -9870  9871 -378  9874 0

c  -1+1 --> 0
c    ( b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0 ∧  p_378) -> (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧ -b^{7, 55}_0)
c  in CNF:
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_2
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_1
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_0
c  in DIMACS:
-9869  9870 -9871 -378 -9872 0
-9869  9870 -9871 -378 -9873 0
-9869  9870 -9871 -378 -9874 0

c  0+1 --> 1
c    (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧  p_378) -> (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0)
c  in CNF:
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_2
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_1
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨  b^{7, 55}_0
c  in DIMACS:
 9869  9870  9871 -378 -9872 0
 9869  9870  9871 -378 -9873 0
 9869  9870  9871 -378  9874 0

c  1+1 --> 2
c    (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0 ∧  p_378) -> (-b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0)
c  in CNF:
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_2
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨  b^{7, 55}_1
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ -p_378 ∨ -b^{7, 55}_0
c  in DIMACS:
 9869  9870 -9871 -378 -9872 0
 9869  9870 -9871 -378  9873 0
 9869  9870 -9871 -378 -9874 0

c  2+1 --> break 
c    (-b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧  p_378) -> break
c  in CNF:
c     b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 9869 -9870  9871 -378 1162 0


c  2-1 --> 1
c    (-b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧ -p_378) -> (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0)
c  in CNF:
c     b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_2
c     b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_1
c     b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨  b^{7, 55}_0
c  in DIMACS:
 9869 -9870  9871  378 -9872 0
 9869 -9870  9871  378 -9873 0
 9869 -9870  9871  378  9874 0

c  1-1 --> 0
c    (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0 ∧ -p_378) -> (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧ -b^{7, 55}_0)
c  in CNF:
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_2
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_1
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_0
c  in DIMACS:
 9869  9870 -9871  378 -9872 0
 9869  9870 -9871  378 -9873 0
 9869  9870 -9871  378 -9874 0

c  0-1 --> -1
c    (-b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧ -p_378) -> ( b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0)
c  in CNF:
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨  b^{7, 55}_2
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_1
c     b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨  b^{7, 55}_0
c  in DIMACS:
 9869  9870  9871  378  9872 0
 9869  9870  9871  378 -9873 0
 9869  9870  9871  378  9874 0

c  -1-1 --> -2
c    ( b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧  b^{7, 54}_0 ∧ -p_378) -> ( b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0)
c  in CNF:
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨  b^{7, 55}_2
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨  b^{7, 55}_1
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨  p_378 ∨ -b^{7, 55}_0
c  in DIMACS:
-9869  9870 -9871  378  9872 0
-9869  9870 -9871  378  9873 0
-9869  9870 -9871  378 -9874 0

c  -2-1 --> break 
c    ( b^{7, 54}_2 ∧  b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨  b^{7, 54}_0 ∨  p_378 ∨ break
c  in DIMACS:
-9869 -9870  9871  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 54}_2 ∧ -b^{7, 54}_1 ∧ -b^{7, 54}_0 ∧ true) 
c  in CNF:
c    -b^{7, 54}_2 ∨  b^{7, 54}_1 ∨  b^{7, 54}_0 ∨ false 
c  in DIMACS:
-9869  9870  9871  0

c  3 does not represent an automaton state.
c    -(-b^{7, 54}_2 ∧  b^{7, 54}_1 ∧  b^{7, 54}_0 ∧ true) 
c  in CNF:
c     b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ false 
c  in DIMACS:
 9869 -9870 -9871  0
c  -3 does not represent an automaton state.
c    -( b^{7, 54}_2 ∧  b^{7, 54}_1 ∧  b^{7, 54}_0 ∧ true) 
c  in CNF:
c    -b^{7, 54}_2 ∨ -b^{7, 54}_1 ∨ -b^{7, 54}_0 ∨ false 
c  in DIMACS:
-9869 -9870 -9871  0

c i = 55
c  -2+1 --> -1
c    ( b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧  p_385) -> ( b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0)
c  in CNF:
c    -b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨  b^{7, 56}_2
c    -b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_1
c    -b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨  b^{7, 56}_0
c  in DIMACS:
-9872 -9873  9874 -385  9875 0
-9872 -9873  9874 -385 -9876 0
-9872 -9873  9874 -385  9877 0

c  -1+1 --> 0
c    ( b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0 ∧  p_385) -> (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧ -b^{7, 56}_0)
c  in CNF:
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_2
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_1
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_0
c  in DIMACS:
-9872  9873 -9874 -385 -9875 0
-9872  9873 -9874 -385 -9876 0
-9872  9873 -9874 -385 -9877 0

c  0+1 --> 1
c    (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧  p_385) -> (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0)
c  in CNF:
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_2
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_1
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨  b^{7, 56}_0
c  in DIMACS:
 9872  9873  9874 -385 -9875 0
 9872  9873  9874 -385 -9876 0
 9872  9873  9874 -385  9877 0

c  1+1 --> 2
c    (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0 ∧  p_385) -> (-b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0)
c  in CNF:
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_2
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨  b^{7, 56}_1
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ -p_385 ∨ -b^{7, 56}_0
c  in DIMACS:
 9872  9873 -9874 -385 -9875 0
 9872  9873 -9874 -385  9876 0
 9872  9873 -9874 -385 -9877 0

c  2+1 --> break 
c    (-b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧  p_385) -> break
c  in CNF:
c     b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 9872 -9873  9874 -385 1162 0


c  2-1 --> 1
c    (-b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧ -p_385) -> (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0)
c  in CNF:
c     b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_2
c     b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_1
c     b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨  b^{7, 56}_0
c  in DIMACS:
 9872 -9873  9874  385 -9875 0
 9872 -9873  9874  385 -9876 0
 9872 -9873  9874  385  9877 0

c  1-1 --> 0
c    (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0 ∧ -p_385) -> (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧ -b^{7, 56}_0)
c  in CNF:
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_2
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_1
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_0
c  in DIMACS:
 9872  9873 -9874  385 -9875 0
 9872  9873 -9874  385 -9876 0
 9872  9873 -9874  385 -9877 0

c  0-1 --> -1
c    (-b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧ -p_385) -> ( b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0)
c  in CNF:
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨  b^{7, 56}_2
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_1
c     b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨  b^{7, 56}_0
c  in DIMACS:
 9872  9873  9874  385  9875 0
 9872  9873  9874  385 -9876 0
 9872  9873  9874  385  9877 0

c  -1-1 --> -2
c    ( b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧  b^{7, 55}_0 ∧ -p_385) -> ( b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0)
c  in CNF:
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨  b^{7, 56}_2
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨  b^{7, 56}_1
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨  p_385 ∨ -b^{7, 56}_0
c  in DIMACS:
-9872  9873 -9874  385  9875 0
-9872  9873 -9874  385  9876 0
-9872  9873 -9874  385 -9877 0

c  -2-1 --> break 
c    ( b^{7, 55}_2 ∧  b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨  b^{7, 55}_0 ∨  p_385 ∨ break
c  in DIMACS:
-9872 -9873  9874  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 55}_2 ∧ -b^{7, 55}_1 ∧ -b^{7, 55}_0 ∧ true) 
c  in CNF:
c    -b^{7, 55}_2 ∨  b^{7, 55}_1 ∨  b^{7, 55}_0 ∨ false 
c  in DIMACS:
-9872  9873  9874  0

c  3 does not represent an automaton state.
c    -(-b^{7, 55}_2 ∧  b^{7, 55}_1 ∧  b^{7, 55}_0 ∧ true) 
c  in CNF:
c     b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ false 
c  in DIMACS:
 9872 -9873 -9874  0
c  -3 does not represent an automaton state.
c    -( b^{7, 55}_2 ∧  b^{7, 55}_1 ∧  b^{7, 55}_0 ∧ true) 
c  in CNF:
c    -b^{7, 55}_2 ∨ -b^{7, 55}_1 ∨ -b^{7, 55}_0 ∨ false 
c  in DIMACS:
-9872 -9873 -9874  0

c i = 56
c  -2+1 --> -1
c    ( b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧  p_392) -> ( b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0)
c  in CNF:
c    -b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨  b^{7, 57}_2
c    -b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_1
c    -b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨  b^{7, 57}_0
c  in DIMACS:
-9875 -9876  9877 -392  9878 0
-9875 -9876  9877 -392 -9879 0
-9875 -9876  9877 -392  9880 0

c  -1+1 --> 0
c    ( b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0 ∧  p_392) -> (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧ -b^{7, 57}_0)
c  in CNF:
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_2
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_1
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_0
c  in DIMACS:
-9875  9876 -9877 -392 -9878 0
-9875  9876 -9877 -392 -9879 0
-9875  9876 -9877 -392 -9880 0

c  0+1 --> 1
c    (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧  p_392) -> (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0)
c  in CNF:
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_2
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_1
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨  b^{7, 57}_0
c  in DIMACS:
 9875  9876  9877 -392 -9878 0
 9875  9876  9877 -392 -9879 0
 9875  9876  9877 -392  9880 0

c  1+1 --> 2
c    (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0 ∧  p_392) -> (-b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0)
c  in CNF:
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_2
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨  b^{7, 57}_1
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ -p_392 ∨ -b^{7, 57}_0
c  in DIMACS:
 9875  9876 -9877 -392 -9878 0
 9875  9876 -9877 -392  9879 0
 9875  9876 -9877 -392 -9880 0

c  2+1 --> break 
c    (-b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧  p_392) -> break
c  in CNF:
c     b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 9875 -9876  9877 -392 1162 0


c  2-1 --> 1
c    (-b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧ -p_392) -> (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0)
c  in CNF:
c     b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_2
c     b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_1
c     b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨  b^{7, 57}_0
c  in DIMACS:
 9875 -9876  9877  392 -9878 0
 9875 -9876  9877  392 -9879 0
 9875 -9876  9877  392  9880 0

c  1-1 --> 0
c    (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0 ∧ -p_392) -> (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧ -b^{7, 57}_0)
c  in CNF:
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_2
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_1
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_0
c  in DIMACS:
 9875  9876 -9877  392 -9878 0
 9875  9876 -9877  392 -9879 0
 9875  9876 -9877  392 -9880 0

c  0-1 --> -1
c    (-b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧ -p_392) -> ( b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0)
c  in CNF:
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨  b^{7, 57}_2
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_1
c     b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨  b^{7, 57}_0
c  in DIMACS:
 9875  9876  9877  392  9878 0
 9875  9876  9877  392 -9879 0
 9875  9876  9877  392  9880 0

c  -1-1 --> -2
c    ( b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧  b^{7, 56}_0 ∧ -p_392) -> ( b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0)
c  in CNF:
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨  b^{7, 57}_2
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨  b^{7, 57}_1
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨  p_392 ∨ -b^{7, 57}_0
c  in DIMACS:
-9875  9876 -9877  392  9878 0
-9875  9876 -9877  392  9879 0
-9875  9876 -9877  392 -9880 0

c  -2-1 --> break 
c    ( b^{7, 56}_2 ∧  b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨  b^{7, 56}_0 ∨  p_392 ∨ break
c  in DIMACS:
-9875 -9876  9877  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 56}_2 ∧ -b^{7, 56}_1 ∧ -b^{7, 56}_0 ∧ true) 
c  in CNF:
c    -b^{7, 56}_2 ∨  b^{7, 56}_1 ∨  b^{7, 56}_0 ∨ false 
c  in DIMACS:
-9875  9876  9877  0

c  3 does not represent an automaton state.
c    -(-b^{7, 56}_2 ∧  b^{7, 56}_1 ∧  b^{7, 56}_0 ∧ true) 
c  in CNF:
c     b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ false 
c  in DIMACS:
 9875 -9876 -9877  0
c  -3 does not represent an automaton state.
c    -( b^{7, 56}_2 ∧  b^{7, 56}_1 ∧  b^{7, 56}_0 ∧ true) 
c  in CNF:
c    -b^{7, 56}_2 ∨ -b^{7, 56}_1 ∨ -b^{7, 56}_0 ∨ false 
c  in DIMACS:
-9875 -9876 -9877  0

c i = 57
c  -2+1 --> -1
c    ( b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧  p_399) -> ( b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0)
c  in CNF:
c    -b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨  b^{7, 58}_2
c    -b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_1
c    -b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨  b^{7, 58}_0
c  in DIMACS:
-9878 -9879  9880 -399  9881 0
-9878 -9879  9880 -399 -9882 0
-9878 -9879  9880 -399  9883 0

c  -1+1 --> 0
c    ( b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0 ∧  p_399) -> (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧ -b^{7, 58}_0)
c  in CNF:
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_2
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_1
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_0
c  in DIMACS:
-9878  9879 -9880 -399 -9881 0
-9878  9879 -9880 -399 -9882 0
-9878  9879 -9880 -399 -9883 0

c  0+1 --> 1
c    (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧  p_399) -> (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0)
c  in CNF:
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_2
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_1
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨  b^{7, 58}_0
c  in DIMACS:
 9878  9879  9880 -399 -9881 0
 9878  9879  9880 -399 -9882 0
 9878  9879  9880 -399  9883 0

c  1+1 --> 2
c    (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0 ∧  p_399) -> (-b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0)
c  in CNF:
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_2
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨  b^{7, 58}_1
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ -p_399 ∨ -b^{7, 58}_0
c  in DIMACS:
 9878  9879 -9880 -399 -9881 0
 9878  9879 -9880 -399  9882 0
 9878  9879 -9880 -399 -9883 0

c  2+1 --> break 
c    (-b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧  p_399) -> break
c  in CNF:
c     b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 9878 -9879  9880 -399 1162 0


c  2-1 --> 1
c    (-b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧ -p_399) -> (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0)
c  in CNF:
c     b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_2
c     b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_1
c     b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨  b^{7, 58}_0
c  in DIMACS:
 9878 -9879  9880  399 -9881 0
 9878 -9879  9880  399 -9882 0
 9878 -9879  9880  399  9883 0

c  1-1 --> 0
c    (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0 ∧ -p_399) -> (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧ -b^{7, 58}_0)
c  in CNF:
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_2
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_1
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_0
c  in DIMACS:
 9878  9879 -9880  399 -9881 0
 9878  9879 -9880  399 -9882 0
 9878  9879 -9880  399 -9883 0

c  0-1 --> -1
c    (-b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧ -p_399) -> ( b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0)
c  in CNF:
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨  b^{7, 58}_2
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_1
c     b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨  b^{7, 58}_0
c  in DIMACS:
 9878  9879  9880  399  9881 0
 9878  9879  9880  399 -9882 0
 9878  9879  9880  399  9883 0

c  -1-1 --> -2
c    ( b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧  b^{7, 57}_0 ∧ -p_399) -> ( b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0)
c  in CNF:
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨  b^{7, 58}_2
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨  b^{7, 58}_1
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨  p_399 ∨ -b^{7, 58}_0
c  in DIMACS:
-9878  9879 -9880  399  9881 0
-9878  9879 -9880  399  9882 0
-9878  9879 -9880  399 -9883 0

c  -2-1 --> break 
c    ( b^{7, 57}_2 ∧  b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨  b^{7, 57}_0 ∨  p_399 ∨ break
c  in DIMACS:
-9878 -9879  9880  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 57}_2 ∧ -b^{7, 57}_1 ∧ -b^{7, 57}_0 ∧ true) 
c  in CNF:
c    -b^{7, 57}_2 ∨  b^{7, 57}_1 ∨  b^{7, 57}_0 ∨ false 
c  in DIMACS:
-9878  9879  9880  0

c  3 does not represent an automaton state.
c    -(-b^{7, 57}_2 ∧  b^{7, 57}_1 ∧  b^{7, 57}_0 ∧ true) 
c  in CNF:
c     b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ false 
c  in DIMACS:
 9878 -9879 -9880  0
c  -3 does not represent an automaton state.
c    -( b^{7, 57}_2 ∧  b^{7, 57}_1 ∧  b^{7, 57}_0 ∧ true) 
c  in CNF:
c    -b^{7, 57}_2 ∨ -b^{7, 57}_1 ∨ -b^{7, 57}_0 ∨ false 
c  in DIMACS:
-9878 -9879 -9880  0

c i = 58
c  -2+1 --> -1
c    ( b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧  p_406) -> ( b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0)
c  in CNF:
c    -b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨  b^{7, 59}_2
c    -b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_1
c    -b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨  b^{7, 59}_0
c  in DIMACS:
-9881 -9882  9883 -406  9884 0
-9881 -9882  9883 -406 -9885 0
-9881 -9882  9883 -406  9886 0

c  -1+1 --> 0
c    ( b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0 ∧  p_406) -> (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧ -b^{7, 59}_0)
c  in CNF:
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_2
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_1
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_0
c  in DIMACS:
-9881  9882 -9883 -406 -9884 0
-9881  9882 -9883 -406 -9885 0
-9881  9882 -9883 -406 -9886 0

c  0+1 --> 1
c    (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧  p_406) -> (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0)
c  in CNF:
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_2
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_1
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨  b^{7, 59}_0
c  in DIMACS:
 9881  9882  9883 -406 -9884 0
 9881  9882  9883 -406 -9885 0
 9881  9882  9883 -406  9886 0

c  1+1 --> 2
c    (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0 ∧  p_406) -> (-b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0)
c  in CNF:
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_2
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨  b^{7, 59}_1
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ -p_406 ∨ -b^{7, 59}_0
c  in DIMACS:
 9881  9882 -9883 -406 -9884 0
 9881  9882 -9883 -406  9885 0
 9881  9882 -9883 -406 -9886 0

c  2+1 --> break 
c    (-b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧  p_406) -> break
c  in CNF:
c     b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 9881 -9882  9883 -406 1162 0


c  2-1 --> 1
c    (-b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧ -p_406) -> (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0)
c  in CNF:
c     b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_2
c     b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_1
c     b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨  b^{7, 59}_0
c  in DIMACS:
 9881 -9882  9883  406 -9884 0
 9881 -9882  9883  406 -9885 0
 9881 -9882  9883  406  9886 0

c  1-1 --> 0
c    (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0 ∧ -p_406) -> (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧ -b^{7, 59}_0)
c  in CNF:
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_2
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_1
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_0
c  in DIMACS:
 9881  9882 -9883  406 -9884 0
 9881  9882 -9883  406 -9885 0
 9881  9882 -9883  406 -9886 0

c  0-1 --> -1
c    (-b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧ -p_406) -> ( b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0)
c  in CNF:
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨  b^{7, 59}_2
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_1
c     b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨  b^{7, 59}_0
c  in DIMACS:
 9881  9882  9883  406  9884 0
 9881  9882  9883  406 -9885 0
 9881  9882  9883  406  9886 0

c  -1-1 --> -2
c    ( b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧  b^{7, 58}_0 ∧ -p_406) -> ( b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0)
c  in CNF:
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨  b^{7, 59}_2
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨  b^{7, 59}_1
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨  p_406 ∨ -b^{7, 59}_0
c  in DIMACS:
-9881  9882 -9883  406  9884 0
-9881  9882 -9883  406  9885 0
-9881  9882 -9883  406 -9886 0

c  -2-1 --> break 
c    ( b^{7, 58}_2 ∧  b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨  b^{7, 58}_0 ∨  p_406 ∨ break
c  in DIMACS:
-9881 -9882  9883  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 58}_2 ∧ -b^{7, 58}_1 ∧ -b^{7, 58}_0 ∧ true) 
c  in CNF:
c    -b^{7, 58}_2 ∨  b^{7, 58}_1 ∨  b^{7, 58}_0 ∨ false 
c  in DIMACS:
-9881  9882  9883  0

c  3 does not represent an automaton state.
c    -(-b^{7, 58}_2 ∧  b^{7, 58}_1 ∧  b^{7, 58}_0 ∧ true) 
c  in CNF:
c     b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ false 
c  in DIMACS:
 9881 -9882 -9883  0
c  -3 does not represent an automaton state.
c    -( b^{7, 58}_2 ∧  b^{7, 58}_1 ∧  b^{7, 58}_0 ∧ true) 
c  in CNF:
c    -b^{7, 58}_2 ∨ -b^{7, 58}_1 ∨ -b^{7, 58}_0 ∨ false 
c  in DIMACS:
-9881 -9882 -9883  0

c i = 59
c  -2+1 --> -1
c    ( b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧  p_413) -> ( b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0)
c  in CNF:
c    -b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨  b^{7, 60}_2
c    -b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_1
c    -b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨  b^{7, 60}_0
c  in DIMACS:
-9884 -9885  9886 -413  9887 0
-9884 -9885  9886 -413 -9888 0
-9884 -9885  9886 -413  9889 0

c  -1+1 --> 0
c    ( b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0 ∧  p_413) -> (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧ -b^{7, 60}_0)
c  in CNF:
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_2
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_1
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_0
c  in DIMACS:
-9884  9885 -9886 -413 -9887 0
-9884  9885 -9886 -413 -9888 0
-9884  9885 -9886 -413 -9889 0

c  0+1 --> 1
c    (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧  p_413) -> (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0)
c  in CNF:
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_2
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_1
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨  b^{7, 60}_0
c  in DIMACS:
 9884  9885  9886 -413 -9887 0
 9884  9885  9886 -413 -9888 0
 9884  9885  9886 -413  9889 0

c  1+1 --> 2
c    (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0 ∧  p_413) -> (-b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0)
c  in CNF:
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_2
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨  b^{7, 60}_1
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ -p_413 ∨ -b^{7, 60}_0
c  in DIMACS:
 9884  9885 -9886 -413 -9887 0
 9884  9885 -9886 -413  9888 0
 9884  9885 -9886 -413 -9889 0

c  2+1 --> break 
c    (-b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧  p_413) -> break
c  in CNF:
c     b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ -p_413 ∨ break
c  in DIMACS:
 9884 -9885  9886 -413 1162 0


c  2-1 --> 1
c    (-b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧ -p_413) -> (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0)
c  in CNF:
c     b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_2
c     b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_1
c     b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨  b^{7, 60}_0
c  in DIMACS:
 9884 -9885  9886  413 -9887 0
 9884 -9885  9886  413 -9888 0
 9884 -9885  9886  413  9889 0

c  1-1 --> 0
c    (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0 ∧ -p_413) -> (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧ -b^{7, 60}_0)
c  in CNF:
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_2
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_1
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_0
c  in DIMACS:
 9884  9885 -9886  413 -9887 0
 9884  9885 -9886  413 -9888 0
 9884  9885 -9886  413 -9889 0

c  0-1 --> -1
c    (-b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧ -p_413) -> ( b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0)
c  in CNF:
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨  b^{7, 60}_2
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_1
c     b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨  b^{7, 60}_0
c  in DIMACS:
 9884  9885  9886  413  9887 0
 9884  9885  9886  413 -9888 0
 9884  9885  9886  413  9889 0

c  -1-1 --> -2
c    ( b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧  b^{7, 59}_0 ∧ -p_413) -> ( b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0)
c  in CNF:
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨  b^{7, 60}_2
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨  b^{7, 60}_1
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨  p_413 ∨ -b^{7, 60}_0
c  in DIMACS:
-9884  9885 -9886  413  9887 0
-9884  9885 -9886  413  9888 0
-9884  9885 -9886  413 -9889 0

c  -2-1 --> break 
c    ( b^{7, 59}_2 ∧  b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧ -p_413) -> break
c  in CNF:
c    -b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨  b^{7, 59}_0 ∨  p_413 ∨ break
c  in DIMACS:
-9884 -9885  9886  413 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 59}_2 ∧ -b^{7, 59}_1 ∧ -b^{7, 59}_0 ∧ true) 
c  in CNF:
c    -b^{7, 59}_2 ∨  b^{7, 59}_1 ∨  b^{7, 59}_0 ∨ false 
c  in DIMACS:
-9884  9885  9886  0

c  3 does not represent an automaton state.
c    -(-b^{7, 59}_2 ∧  b^{7, 59}_1 ∧  b^{7, 59}_0 ∧ true) 
c  in CNF:
c     b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ false 
c  in DIMACS:
 9884 -9885 -9886  0
c  -3 does not represent an automaton state.
c    -( b^{7, 59}_2 ∧  b^{7, 59}_1 ∧  b^{7, 59}_0 ∧ true) 
c  in CNF:
c    -b^{7, 59}_2 ∨ -b^{7, 59}_1 ∨ -b^{7, 59}_0 ∨ false 
c  in DIMACS:
-9884 -9885 -9886  0

c i = 60
c  -2+1 --> -1
c    ( b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧  p_420) -> ( b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0)
c  in CNF:
c    -b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨  b^{7, 61}_2
c    -b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_1
c    -b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨  b^{7, 61}_0
c  in DIMACS:
-9887 -9888  9889 -420  9890 0
-9887 -9888  9889 -420 -9891 0
-9887 -9888  9889 -420  9892 0

c  -1+1 --> 0
c    ( b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0 ∧  p_420) -> (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧ -b^{7, 61}_0)
c  in CNF:
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_2
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_1
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_0
c  in DIMACS:
-9887  9888 -9889 -420 -9890 0
-9887  9888 -9889 -420 -9891 0
-9887  9888 -9889 -420 -9892 0

c  0+1 --> 1
c    (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧  p_420) -> (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0)
c  in CNF:
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_2
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_1
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨  b^{7, 61}_0
c  in DIMACS:
 9887  9888  9889 -420 -9890 0
 9887  9888  9889 -420 -9891 0
 9887  9888  9889 -420  9892 0

c  1+1 --> 2
c    (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0 ∧  p_420) -> (-b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0)
c  in CNF:
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_2
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨  b^{7, 61}_1
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ -p_420 ∨ -b^{7, 61}_0
c  in DIMACS:
 9887  9888 -9889 -420 -9890 0
 9887  9888 -9889 -420  9891 0
 9887  9888 -9889 -420 -9892 0

c  2+1 --> break 
c    (-b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧  p_420) -> break
c  in CNF:
c     b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 9887 -9888  9889 -420 1162 0


c  2-1 --> 1
c    (-b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧ -p_420) -> (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0)
c  in CNF:
c     b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_2
c     b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_1
c     b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨  b^{7, 61}_0
c  in DIMACS:
 9887 -9888  9889  420 -9890 0
 9887 -9888  9889  420 -9891 0
 9887 -9888  9889  420  9892 0

c  1-1 --> 0
c    (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0 ∧ -p_420) -> (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧ -b^{7, 61}_0)
c  in CNF:
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_2
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_1
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_0
c  in DIMACS:
 9887  9888 -9889  420 -9890 0
 9887  9888 -9889  420 -9891 0
 9887  9888 -9889  420 -9892 0

c  0-1 --> -1
c    (-b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧ -p_420) -> ( b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0)
c  in CNF:
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨  b^{7, 61}_2
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_1
c     b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨  b^{7, 61}_0
c  in DIMACS:
 9887  9888  9889  420  9890 0
 9887  9888  9889  420 -9891 0
 9887  9888  9889  420  9892 0

c  -1-1 --> -2
c    ( b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧  b^{7, 60}_0 ∧ -p_420) -> ( b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0)
c  in CNF:
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨  b^{7, 61}_2
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨  b^{7, 61}_1
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨  p_420 ∨ -b^{7, 61}_0
c  in DIMACS:
-9887  9888 -9889  420  9890 0
-9887  9888 -9889  420  9891 0
-9887  9888 -9889  420 -9892 0

c  -2-1 --> break 
c    ( b^{7, 60}_2 ∧  b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨  b^{7, 60}_0 ∨  p_420 ∨ break
c  in DIMACS:
-9887 -9888  9889  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 60}_2 ∧ -b^{7, 60}_1 ∧ -b^{7, 60}_0 ∧ true) 
c  in CNF:
c    -b^{7, 60}_2 ∨  b^{7, 60}_1 ∨  b^{7, 60}_0 ∨ false 
c  in DIMACS:
-9887  9888  9889  0

c  3 does not represent an automaton state.
c    -(-b^{7, 60}_2 ∧  b^{7, 60}_1 ∧  b^{7, 60}_0 ∧ true) 
c  in CNF:
c     b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ false 
c  in DIMACS:
 9887 -9888 -9889  0
c  -3 does not represent an automaton state.
c    -( b^{7, 60}_2 ∧  b^{7, 60}_1 ∧  b^{7, 60}_0 ∧ true) 
c  in CNF:
c    -b^{7, 60}_2 ∨ -b^{7, 60}_1 ∨ -b^{7, 60}_0 ∨ false 
c  in DIMACS:
-9887 -9888 -9889  0

c i = 61
c  -2+1 --> -1
c    ( b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧  p_427) -> ( b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0)
c  in CNF:
c    -b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨  b^{7, 62}_2
c    -b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_1
c    -b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨  b^{7, 62}_0
c  in DIMACS:
-9890 -9891  9892 -427  9893 0
-9890 -9891  9892 -427 -9894 0
-9890 -9891  9892 -427  9895 0

c  -1+1 --> 0
c    ( b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0 ∧  p_427) -> (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧ -b^{7, 62}_0)
c  in CNF:
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_2
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_1
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_0
c  in DIMACS:
-9890  9891 -9892 -427 -9893 0
-9890  9891 -9892 -427 -9894 0
-9890  9891 -9892 -427 -9895 0

c  0+1 --> 1
c    (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧  p_427) -> (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0)
c  in CNF:
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_2
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_1
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨  b^{7, 62}_0
c  in DIMACS:
 9890  9891  9892 -427 -9893 0
 9890  9891  9892 -427 -9894 0
 9890  9891  9892 -427  9895 0

c  1+1 --> 2
c    (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0 ∧  p_427) -> (-b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0)
c  in CNF:
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_2
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨  b^{7, 62}_1
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ -p_427 ∨ -b^{7, 62}_0
c  in DIMACS:
 9890  9891 -9892 -427 -9893 0
 9890  9891 -9892 -427  9894 0
 9890  9891 -9892 -427 -9895 0

c  2+1 --> break 
c    (-b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧  p_427) -> break
c  in CNF:
c     b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ -p_427 ∨ break
c  in DIMACS:
 9890 -9891  9892 -427 1162 0


c  2-1 --> 1
c    (-b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧ -p_427) -> (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0)
c  in CNF:
c     b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_2
c     b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_1
c     b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨  b^{7, 62}_0
c  in DIMACS:
 9890 -9891  9892  427 -9893 0
 9890 -9891  9892  427 -9894 0
 9890 -9891  9892  427  9895 0

c  1-1 --> 0
c    (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0 ∧ -p_427) -> (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧ -b^{7, 62}_0)
c  in CNF:
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_2
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_1
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_0
c  in DIMACS:
 9890  9891 -9892  427 -9893 0
 9890  9891 -9892  427 -9894 0
 9890  9891 -9892  427 -9895 0

c  0-1 --> -1
c    (-b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧ -p_427) -> ( b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0)
c  in CNF:
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨  b^{7, 62}_2
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_1
c     b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨  b^{7, 62}_0
c  in DIMACS:
 9890  9891  9892  427  9893 0
 9890  9891  9892  427 -9894 0
 9890  9891  9892  427  9895 0

c  -1-1 --> -2
c    ( b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧  b^{7, 61}_0 ∧ -p_427) -> ( b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0)
c  in CNF:
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨  b^{7, 62}_2
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨  b^{7, 62}_1
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨  p_427 ∨ -b^{7, 62}_0
c  in DIMACS:
-9890  9891 -9892  427  9893 0
-9890  9891 -9892  427  9894 0
-9890  9891 -9892  427 -9895 0

c  -2-1 --> break 
c    ( b^{7, 61}_2 ∧  b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧ -p_427) -> break
c  in CNF:
c    -b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨  b^{7, 61}_0 ∨  p_427 ∨ break
c  in DIMACS:
-9890 -9891  9892  427 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 61}_2 ∧ -b^{7, 61}_1 ∧ -b^{7, 61}_0 ∧ true) 
c  in CNF:
c    -b^{7, 61}_2 ∨  b^{7, 61}_1 ∨  b^{7, 61}_0 ∨ false 
c  in DIMACS:
-9890  9891  9892  0

c  3 does not represent an automaton state.
c    -(-b^{7, 61}_2 ∧  b^{7, 61}_1 ∧  b^{7, 61}_0 ∧ true) 
c  in CNF:
c     b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ false 
c  in DIMACS:
 9890 -9891 -9892  0
c  -3 does not represent an automaton state.
c    -( b^{7, 61}_2 ∧  b^{7, 61}_1 ∧  b^{7, 61}_0 ∧ true) 
c  in CNF:
c    -b^{7, 61}_2 ∨ -b^{7, 61}_1 ∨ -b^{7, 61}_0 ∨ false 
c  in DIMACS:
-9890 -9891 -9892  0

c i = 62
c  -2+1 --> -1
c    ( b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧  p_434) -> ( b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0)
c  in CNF:
c    -b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨  b^{7, 63}_2
c    -b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_1
c    -b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨  b^{7, 63}_0
c  in DIMACS:
-9893 -9894  9895 -434  9896 0
-9893 -9894  9895 -434 -9897 0
-9893 -9894  9895 -434  9898 0

c  -1+1 --> 0
c    ( b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0 ∧  p_434) -> (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧ -b^{7, 63}_0)
c  in CNF:
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_2
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_1
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_0
c  in DIMACS:
-9893  9894 -9895 -434 -9896 0
-9893  9894 -9895 -434 -9897 0
-9893  9894 -9895 -434 -9898 0

c  0+1 --> 1
c    (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧  p_434) -> (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0)
c  in CNF:
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_2
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_1
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨  b^{7, 63}_0
c  in DIMACS:
 9893  9894  9895 -434 -9896 0
 9893  9894  9895 -434 -9897 0
 9893  9894  9895 -434  9898 0

c  1+1 --> 2
c    (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0 ∧  p_434) -> (-b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0)
c  in CNF:
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_2
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨  b^{7, 63}_1
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ -p_434 ∨ -b^{7, 63}_0
c  in DIMACS:
 9893  9894 -9895 -434 -9896 0
 9893  9894 -9895 -434  9897 0
 9893  9894 -9895 -434 -9898 0

c  2+1 --> break 
c    (-b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧  p_434) -> break
c  in CNF:
c     b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 9893 -9894  9895 -434 1162 0


c  2-1 --> 1
c    (-b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧ -p_434) -> (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0)
c  in CNF:
c     b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_2
c     b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_1
c     b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨  b^{7, 63}_0
c  in DIMACS:
 9893 -9894  9895  434 -9896 0
 9893 -9894  9895  434 -9897 0
 9893 -9894  9895  434  9898 0

c  1-1 --> 0
c    (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0 ∧ -p_434) -> (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧ -b^{7, 63}_0)
c  in CNF:
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_2
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_1
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_0
c  in DIMACS:
 9893  9894 -9895  434 -9896 0
 9893  9894 -9895  434 -9897 0
 9893  9894 -9895  434 -9898 0

c  0-1 --> -1
c    (-b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧ -p_434) -> ( b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0)
c  in CNF:
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨  b^{7, 63}_2
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_1
c     b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨  b^{7, 63}_0
c  in DIMACS:
 9893  9894  9895  434  9896 0
 9893  9894  9895  434 -9897 0
 9893  9894  9895  434  9898 0

c  -1-1 --> -2
c    ( b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧  b^{7, 62}_0 ∧ -p_434) -> ( b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0)
c  in CNF:
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨  b^{7, 63}_2
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨  b^{7, 63}_1
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨  p_434 ∨ -b^{7, 63}_0
c  in DIMACS:
-9893  9894 -9895  434  9896 0
-9893  9894 -9895  434  9897 0
-9893  9894 -9895  434 -9898 0

c  -2-1 --> break 
c    ( b^{7, 62}_2 ∧  b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨  b^{7, 62}_0 ∨  p_434 ∨ break
c  in DIMACS:
-9893 -9894  9895  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 62}_2 ∧ -b^{7, 62}_1 ∧ -b^{7, 62}_0 ∧ true) 
c  in CNF:
c    -b^{7, 62}_2 ∨  b^{7, 62}_1 ∨  b^{7, 62}_0 ∨ false 
c  in DIMACS:
-9893  9894  9895  0

c  3 does not represent an automaton state.
c    -(-b^{7, 62}_2 ∧  b^{7, 62}_1 ∧  b^{7, 62}_0 ∧ true) 
c  in CNF:
c     b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ false 
c  in DIMACS:
 9893 -9894 -9895  0
c  -3 does not represent an automaton state.
c    -( b^{7, 62}_2 ∧  b^{7, 62}_1 ∧  b^{7, 62}_0 ∧ true) 
c  in CNF:
c    -b^{7, 62}_2 ∨ -b^{7, 62}_1 ∨ -b^{7, 62}_0 ∨ false 
c  in DIMACS:
-9893 -9894 -9895  0

c i = 63
c  -2+1 --> -1
c    ( b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧  p_441) -> ( b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0)
c  in CNF:
c    -b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨  b^{7, 64}_2
c    -b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_1
c    -b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨  b^{7, 64}_0
c  in DIMACS:
-9896 -9897  9898 -441  9899 0
-9896 -9897  9898 -441 -9900 0
-9896 -9897  9898 -441  9901 0

c  -1+1 --> 0
c    ( b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0 ∧  p_441) -> (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧ -b^{7, 64}_0)
c  in CNF:
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_2
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_1
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_0
c  in DIMACS:
-9896  9897 -9898 -441 -9899 0
-9896  9897 -9898 -441 -9900 0
-9896  9897 -9898 -441 -9901 0

c  0+1 --> 1
c    (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧  p_441) -> (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0)
c  in CNF:
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_2
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_1
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨  b^{7, 64}_0
c  in DIMACS:
 9896  9897  9898 -441 -9899 0
 9896  9897  9898 -441 -9900 0
 9896  9897  9898 -441  9901 0

c  1+1 --> 2
c    (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0 ∧  p_441) -> (-b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0)
c  in CNF:
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_2
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨  b^{7, 64}_1
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ -p_441 ∨ -b^{7, 64}_0
c  in DIMACS:
 9896  9897 -9898 -441 -9899 0
 9896  9897 -9898 -441  9900 0
 9896  9897 -9898 -441 -9901 0

c  2+1 --> break 
c    (-b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧  p_441) -> break
c  in CNF:
c     b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 9896 -9897  9898 -441 1162 0


c  2-1 --> 1
c    (-b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧ -p_441) -> (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0)
c  in CNF:
c     b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_2
c     b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_1
c     b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨  b^{7, 64}_0
c  in DIMACS:
 9896 -9897  9898  441 -9899 0
 9896 -9897  9898  441 -9900 0
 9896 -9897  9898  441  9901 0

c  1-1 --> 0
c    (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0 ∧ -p_441) -> (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧ -b^{7, 64}_0)
c  in CNF:
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_2
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_1
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_0
c  in DIMACS:
 9896  9897 -9898  441 -9899 0
 9896  9897 -9898  441 -9900 0
 9896  9897 -9898  441 -9901 0

c  0-1 --> -1
c    (-b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧ -p_441) -> ( b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0)
c  in CNF:
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨  b^{7, 64}_2
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_1
c     b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨  b^{7, 64}_0
c  in DIMACS:
 9896  9897  9898  441  9899 0
 9896  9897  9898  441 -9900 0
 9896  9897  9898  441  9901 0

c  -1-1 --> -2
c    ( b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧  b^{7, 63}_0 ∧ -p_441) -> ( b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0)
c  in CNF:
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨  b^{7, 64}_2
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨  b^{7, 64}_1
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨  p_441 ∨ -b^{7, 64}_0
c  in DIMACS:
-9896  9897 -9898  441  9899 0
-9896  9897 -9898  441  9900 0
-9896  9897 -9898  441 -9901 0

c  -2-1 --> break 
c    ( b^{7, 63}_2 ∧  b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨  b^{7, 63}_0 ∨  p_441 ∨ break
c  in DIMACS:
-9896 -9897  9898  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 63}_2 ∧ -b^{7, 63}_1 ∧ -b^{7, 63}_0 ∧ true) 
c  in CNF:
c    -b^{7, 63}_2 ∨  b^{7, 63}_1 ∨  b^{7, 63}_0 ∨ false 
c  in DIMACS:
-9896  9897  9898  0

c  3 does not represent an automaton state.
c    -(-b^{7, 63}_2 ∧  b^{7, 63}_1 ∧  b^{7, 63}_0 ∧ true) 
c  in CNF:
c     b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ false 
c  in DIMACS:
 9896 -9897 -9898  0
c  -3 does not represent an automaton state.
c    -( b^{7, 63}_2 ∧  b^{7, 63}_1 ∧  b^{7, 63}_0 ∧ true) 
c  in CNF:
c    -b^{7, 63}_2 ∨ -b^{7, 63}_1 ∨ -b^{7, 63}_0 ∨ false 
c  in DIMACS:
-9896 -9897 -9898  0

c i = 64
c  -2+1 --> -1
c    ( b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧  p_448) -> ( b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0)
c  in CNF:
c    -b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨  b^{7, 65}_2
c    -b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_1
c    -b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨  b^{7, 65}_0
c  in DIMACS:
-9899 -9900  9901 -448  9902 0
-9899 -9900  9901 -448 -9903 0
-9899 -9900  9901 -448  9904 0

c  -1+1 --> 0
c    ( b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0 ∧  p_448) -> (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧ -b^{7, 65}_0)
c  in CNF:
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_2
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_1
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_0
c  in DIMACS:
-9899  9900 -9901 -448 -9902 0
-9899  9900 -9901 -448 -9903 0
-9899  9900 -9901 -448 -9904 0

c  0+1 --> 1
c    (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧  p_448) -> (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0)
c  in CNF:
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_2
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_1
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨  b^{7, 65}_0
c  in DIMACS:
 9899  9900  9901 -448 -9902 0
 9899  9900  9901 -448 -9903 0
 9899  9900  9901 -448  9904 0

c  1+1 --> 2
c    (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0 ∧  p_448) -> (-b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0)
c  in CNF:
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_2
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨  b^{7, 65}_1
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ -p_448 ∨ -b^{7, 65}_0
c  in DIMACS:
 9899  9900 -9901 -448 -9902 0
 9899  9900 -9901 -448  9903 0
 9899  9900 -9901 -448 -9904 0

c  2+1 --> break 
c    (-b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧  p_448) -> break
c  in CNF:
c     b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 9899 -9900  9901 -448 1162 0


c  2-1 --> 1
c    (-b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧ -p_448) -> (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0)
c  in CNF:
c     b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_2
c     b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_1
c     b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨  b^{7, 65}_0
c  in DIMACS:
 9899 -9900  9901  448 -9902 0
 9899 -9900  9901  448 -9903 0
 9899 -9900  9901  448  9904 0

c  1-1 --> 0
c    (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0 ∧ -p_448) -> (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧ -b^{7, 65}_0)
c  in CNF:
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_2
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_1
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_0
c  in DIMACS:
 9899  9900 -9901  448 -9902 0
 9899  9900 -9901  448 -9903 0
 9899  9900 -9901  448 -9904 0

c  0-1 --> -1
c    (-b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧ -p_448) -> ( b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0)
c  in CNF:
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨  b^{7, 65}_2
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_1
c     b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨  b^{7, 65}_0
c  in DIMACS:
 9899  9900  9901  448  9902 0
 9899  9900  9901  448 -9903 0
 9899  9900  9901  448  9904 0

c  -1-1 --> -2
c    ( b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧  b^{7, 64}_0 ∧ -p_448) -> ( b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0)
c  in CNF:
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨  b^{7, 65}_2
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨  b^{7, 65}_1
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨  p_448 ∨ -b^{7, 65}_0
c  in DIMACS:
-9899  9900 -9901  448  9902 0
-9899  9900 -9901  448  9903 0
-9899  9900 -9901  448 -9904 0

c  -2-1 --> break 
c    ( b^{7, 64}_2 ∧  b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨  b^{7, 64}_0 ∨  p_448 ∨ break
c  in DIMACS:
-9899 -9900  9901  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 64}_2 ∧ -b^{7, 64}_1 ∧ -b^{7, 64}_0 ∧ true) 
c  in CNF:
c    -b^{7, 64}_2 ∨  b^{7, 64}_1 ∨  b^{7, 64}_0 ∨ false 
c  in DIMACS:
-9899  9900  9901  0

c  3 does not represent an automaton state.
c    -(-b^{7, 64}_2 ∧  b^{7, 64}_1 ∧  b^{7, 64}_0 ∧ true) 
c  in CNF:
c     b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ false 
c  in DIMACS:
 9899 -9900 -9901  0
c  -3 does not represent an automaton state.
c    -( b^{7, 64}_2 ∧  b^{7, 64}_1 ∧  b^{7, 64}_0 ∧ true) 
c  in CNF:
c    -b^{7, 64}_2 ∨ -b^{7, 64}_1 ∨ -b^{7, 64}_0 ∨ false 
c  in DIMACS:
-9899 -9900 -9901  0

c i = 65
c  -2+1 --> -1
c    ( b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧  p_455) -> ( b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0)
c  in CNF:
c    -b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨  b^{7, 66}_2
c    -b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_1
c    -b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨  b^{7, 66}_0
c  in DIMACS:
-9902 -9903  9904 -455  9905 0
-9902 -9903  9904 -455 -9906 0
-9902 -9903  9904 -455  9907 0

c  -1+1 --> 0
c    ( b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0 ∧  p_455) -> (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧ -b^{7, 66}_0)
c  in CNF:
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_2
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_1
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_0
c  in DIMACS:
-9902  9903 -9904 -455 -9905 0
-9902  9903 -9904 -455 -9906 0
-9902  9903 -9904 -455 -9907 0

c  0+1 --> 1
c    (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧  p_455) -> (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0)
c  in CNF:
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_2
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_1
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨  b^{7, 66}_0
c  in DIMACS:
 9902  9903  9904 -455 -9905 0
 9902  9903  9904 -455 -9906 0
 9902  9903  9904 -455  9907 0

c  1+1 --> 2
c    (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0 ∧  p_455) -> (-b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0)
c  in CNF:
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_2
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨  b^{7, 66}_1
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ -p_455 ∨ -b^{7, 66}_0
c  in DIMACS:
 9902  9903 -9904 -455 -9905 0
 9902  9903 -9904 -455  9906 0
 9902  9903 -9904 -455 -9907 0

c  2+1 --> break 
c    (-b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧  p_455) -> break
c  in CNF:
c     b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 9902 -9903  9904 -455 1162 0


c  2-1 --> 1
c    (-b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧ -p_455) -> (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0)
c  in CNF:
c     b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_2
c     b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_1
c     b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨  b^{7, 66}_0
c  in DIMACS:
 9902 -9903  9904  455 -9905 0
 9902 -9903  9904  455 -9906 0
 9902 -9903  9904  455  9907 0

c  1-1 --> 0
c    (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0 ∧ -p_455) -> (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧ -b^{7, 66}_0)
c  in CNF:
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_2
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_1
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_0
c  in DIMACS:
 9902  9903 -9904  455 -9905 0
 9902  9903 -9904  455 -9906 0
 9902  9903 -9904  455 -9907 0

c  0-1 --> -1
c    (-b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧ -p_455) -> ( b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0)
c  in CNF:
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨  b^{7, 66}_2
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_1
c     b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨  b^{7, 66}_0
c  in DIMACS:
 9902  9903  9904  455  9905 0
 9902  9903  9904  455 -9906 0
 9902  9903  9904  455  9907 0

c  -1-1 --> -2
c    ( b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧  b^{7, 65}_0 ∧ -p_455) -> ( b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0)
c  in CNF:
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨  b^{7, 66}_2
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨  b^{7, 66}_1
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨  p_455 ∨ -b^{7, 66}_0
c  in DIMACS:
-9902  9903 -9904  455  9905 0
-9902  9903 -9904  455  9906 0
-9902  9903 -9904  455 -9907 0

c  -2-1 --> break 
c    ( b^{7, 65}_2 ∧  b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨  b^{7, 65}_0 ∨  p_455 ∨ break
c  in DIMACS:
-9902 -9903  9904  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 65}_2 ∧ -b^{7, 65}_1 ∧ -b^{7, 65}_0 ∧ true) 
c  in CNF:
c    -b^{7, 65}_2 ∨  b^{7, 65}_1 ∨  b^{7, 65}_0 ∨ false 
c  in DIMACS:
-9902  9903  9904  0

c  3 does not represent an automaton state.
c    -(-b^{7, 65}_2 ∧  b^{7, 65}_1 ∧  b^{7, 65}_0 ∧ true) 
c  in CNF:
c     b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ false 
c  in DIMACS:
 9902 -9903 -9904  0
c  -3 does not represent an automaton state.
c    -( b^{7, 65}_2 ∧  b^{7, 65}_1 ∧  b^{7, 65}_0 ∧ true) 
c  in CNF:
c    -b^{7, 65}_2 ∨ -b^{7, 65}_1 ∨ -b^{7, 65}_0 ∨ false 
c  in DIMACS:
-9902 -9903 -9904  0

c i = 66
c  -2+1 --> -1
c    ( b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧  p_462) -> ( b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0)
c  in CNF:
c    -b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨  b^{7, 67}_2
c    -b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_1
c    -b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨  b^{7, 67}_0
c  in DIMACS:
-9905 -9906  9907 -462  9908 0
-9905 -9906  9907 -462 -9909 0
-9905 -9906  9907 -462  9910 0

c  -1+1 --> 0
c    ( b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0 ∧  p_462) -> (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧ -b^{7, 67}_0)
c  in CNF:
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_2
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_1
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_0
c  in DIMACS:
-9905  9906 -9907 -462 -9908 0
-9905  9906 -9907 -462 -9909 0
-9905  9906 -9907 -462 -9910 0

c  0+1 --> 1
c    (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧  p_462) -> (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0)
c  in CNF:
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_2
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_1
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨  b^{7, 67}_0
c  in DIMACS:
 9905  9906  9907 -462 -9908 0
 9905  9906  9907 -462 -9909 0
 9905  9906  9907 -462  9910 0

c  1+1 --> 2
c    (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0 ∧  p_462) -> (-b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0)
c  in CNF:
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_2
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨  b^{7, 67}_1
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ -p_462 ∨ -b^{7, 67}_0
c  in DIMACS:
 9905  9906 -9907 -462 -9908 0
 9905  9906 -9907 -462  9909 0
 9905  9906 -9907 -462 -9910 0

c  2+1 --> break 
c    (-b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧  p_462) -> break
c  in CNF:
c     b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 9905 -9906  9907 -462 1162 0


c  2-1 --> 1
c    (-b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧ -p_462) -> (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0)
c  in CNF:
c     b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_2
c     b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_1
c     b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨  b^{7, 67}_0
c  in DIMACS:
 9905 -9906  9907  462 -9908 0
 9905 -9906  9907  462 -9909 0
 9905 -9906  9907  462  9910 0

c  1-1 --> 0
c    (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0 ∧ -p_462) -> (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧ -b^{7, 67}_0)
c  in CNF:
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_2
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_1
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_0
c  in DIMACS:
 9905  9906 -9907  462 -9908 0
 9905  9906 -9907  462 -9909 0
 9905  9906 -9907  462 -9910 0

c  0-1 --> -1
c    (-b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧ -p_462) -> ( b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0)
c  in CNF:
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨  b^{7, 67}_2
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_1
c     b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨  b^{7, 67}_0
c  in DIMACS:
 9905  9906  9907  462  9908 0
 9905  9906  9907  462 -9909 0
 9905  9906  9907  462  9910 0

c  -1-1 --> -2
c    ( b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧  b^{7, 66}_0 ∧ -p_462) -> ( b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0)
c  in CNF:
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨  b^{7, 67}_2
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨  b^{7, 67}_1
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨  p_462 ∨ -b^{7, 67}_0
c  in DIMACS:
-9905  9906 -9907  462  9908 0
-9905  9906 -9907  462  9909 0
-9905  9906 -9907  462 -9910 0

c  -2-1 --> break 
c    ( b^{7, 66}_2 ∧  b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨  b^{7, 66}_0 ∨  p_462 ∨ break
c  in DIMACS:
-9905 -9906  9907  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 66}_2 ∧ -b^{7, 66}_1 ∧ -b^{7, 66}_0 ∧ true) 
c  in CNF:
c    -b^{7, 66}_2 ∨  b^{7, 66}_1 ∨  b^{7, 66}_0 ∨ false 
c  in DIMACS:
-9905  9906  9907  0

c  3 does not represent an automaton state.
c    -(-b^{7, 66}_2 ∧  b^{7, 66}_1 ∧  b^{7, 66}_0 ∧ true) 
c  in CNF:
c     b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ false 
c  in DIMACS:
 9905 -9906 -9907  0
c  -3 does not represent an automaton state.
c    -( b^{7, 66}_2 ∧  b^{7, 66}_1 ∧  b^{7, 66}_0 ∧ true) 
c  in CNF:
c    -b^{7, 66}_2 ∨ -b^{7, 66}_1 ∨ -b^{7, 66}_0 ∨ false 
c  in DIMACS:
-9905 -9906 -9907  0

c i = 67
c  -2+1 --> -1
c    ( b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧  p_469) -> ( b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0)
c  in CNF:
c    -b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨  b^{7, 68}_2
c    -b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_1
c    -b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨  b^{7, 68}_0
c  in DIMACS:
-9908 -9909  9910 -469  9911 0
-9908 -9909  9910 -469 -9912 0
-9908 -9909  9910 -469  9913 0

c  -1+1 --> 0
c    ( b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0 ∧  p_469) -> (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧ -b^{7, 68}_0)
c  in CNF:
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_2
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_1
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_0
c  in DIMACS:
-9908  9909 -9910 -469 -9911 0
-9908  9909 -9910 -469 -9912 0
-9908  9909 -9910 -469 -9913 0

c  0+1 --> 1
c    (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧  p_469) -> (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0)
c  in CNF:
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_2
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_1
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨  b^{7, 68}_0
c  in DIMACS:
 9908  9909  9910 -469 -9911 0
 9908  9909  9910 -469 -9912 0
 9908  9909  9910 -469  9913 0

c  1+1 --> 2
c    (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0 ∧  p_469) -> (-b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0)
c  in CNF:
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_2
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨  b^{7, 68}_1
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ -p_469 ∨ -b^{7, 68}_0
c  in DIMACS:
 9908  9909 -9910 -469 -9911 0
 9908  9909 -9910 -469  9912 0
 9908  9909 -9910 -469 -9913 0

c  2+1 --> break 
c    (-b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧  p_469) -> break
c  in CNF:
c     b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ -p_469 ∨ break
c  in DIMACS:
 9908 -9909  9910 -469 1162 0


c  2-1 --> 1
c    (-b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧ -p_469) -> (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0)
c  in CNF:
c     b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_2
c     b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_1
c     b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨  b^{7, 68}_0
c  in DIMACS:
 9908 -9909  9910  469 -9911 0
 9908 -9909  9910  469 -9912 0
 9908 -9909  9910  469  9913 0

c  1-1 --> 0
c    (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0 ∧ -p_469) -> (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧ -b^{7, 68}_0)
c  in CNF:
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_2
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_1
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_0
c  in DIMACS:
 9908  9909 -9910  469 -9911 0
 9908  9909 -9910  469 -9912 0
 9908  9909 -9910  469 -9913 0

c  0-1 --> -1
c    (-b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧ -p_469) -> ( b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0)
c  in CNF:
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨  b^{7, 68}_2
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_1
c     b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨  b^{7, 68}_0
c  in DIMACS:
 9908  9909  9910  469  9911 0
 9908  9909  9910  469 -9912 0
 9908  9909  9910  469  9913 0

c  -1-1 --> -2
c    ( b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧  b^{7, 67}_0 ∧ -p_469) -> ( b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0)
c  in CNF:
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨  b^{7, 68}_2
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨  b^{7, 68}_1
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨  p_469 ∨ -b^{7, 68}_0
c  in DIMACS:
-9908  9909 -9910  469  9911 0
-9908  9909 -9910  469  9912 0
-9908  9909 -9910  469 -9913 0

c  -2-1 --> break 
c    ( b^{7, 67}_2 ∧  b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧ -p_469) -> break
c  in CNF:
c    -b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨  b^{7, 67}_0 ∨  p_469 ∨ break
c  in DIMACS:
-9908 -9909  9910  469 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 67}_2 ∧ -b^{7, 67}_1 ∧ -b^{7, 67}_0 ∧ true) 
c  in CNF:
c    -b^{7, 67}_2 ∨  b^{7, 67}_1 ∨  b^{7, 67}_0 ∨ false 
c  in DIMACS:
-9908  9909  9910  0

c  3 does not represent an automaton state.
c    -(-b^{7, 67}_2 ∧  b^{7, 67}_1 ∧  b^{7, 67}_0 ∧ true) 
c  in CNF:
c     b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ false 
c  in DIMACS:
 9908 -9909 -9910  0
c  -3 does not represent an automaton state.
c    -( b^{7, 67}_2 ∧  b^{7, 67}_1 ∧  b^{7, 67}_0 ∧ true) 
c  in CNF:
c    -b^{7, 67}_2 ∨ -b^{7, 67}_1 ∨ -b^{7, 67}_0 ∨ false 
c  in DIMACS:
-9908 -9909 -9910  0

c i = 68
c  -2+1 --> -1
c    ( b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧  p_476) -> ( b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0)
c  in CNF:
c    -b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨  b^{7, 69}_2
c    -b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_1
c    -b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨  b^{7, 69}_0
c  in DIMACS:
-9911 -9912  9913 -476  9914 0
-9911 -9912  9913 -476 -9915 0
-9911 -9912  9913 -476  9916 0

c  -1+1 --> 0
c    ( b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0 ∧  p_476) -> (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧ -b^{7, 69}_0)
c  in CNF:
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_2
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_1
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_0
c  in DIMACS:
-9911  9912 -9913 -476 -9914 0
-9911  9912 -9913 -476 -9915 0
-9911  9912 -9913 -476 -9916 0

c  0+1 --> 1
c    (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧  p_476) -> (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0)
c  in CNF:
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_2
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_1
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨  b^{7, 69}_0
c  in DIMACS:
 9911  9912  9913 -476 -9914 0
 9911  9912  9913 -476 -9915 0
 9911  9912  9913 -476  9916 0

c  1+1 --> 2
c    (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0 ∧  p_476) -> (-b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0)
c  in CNF:
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_2
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨  b^{7, 69}_1
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ -p_476 ∨ -b^{7, 69}_0
c  in DIMACS:
 9911  9912 -9913 -476 -9914 0
 9911  9912 -9913 -476  9915 0
 9911  9912 -9913 -476 -9916 0

c  2+1 --> break 
c    (-b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧  p_476) -> break
c  in CNF:
c     b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 9911 -9912  9913 -476 1162 0


c  2-1 --> 1
c    (-b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧ -p_476) -> (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0)
c  in CNF:
c     b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_2
c     b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_1
c     b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨  b^{7, 69}_0
c  in DIMACS:
 9911 -9912  9913  476 -9914 0
 9911 -9912  9913  476 -9915 0
 9911 -9912  9913  476  9916 0

c  1-1 --> 0
c    (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0 ∧ -p_476) -> (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧ -b^{7, 69}_0)
c  in CNF:
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_2
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_1
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_0
c  in DIMACS:
 9911  9912 -9913  476 -9914 0
 9911  9912 -9913  476 -9915 0
 9911  9912 -9913  476 -9916 0

c  0-1 --> -1
c    (-b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧ -p_476) -> ( b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0)
c  in CNF:
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨  b^{7, 69}_2
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_1
c     b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨  b^{7, 69}_0
c  in DIMACS:
 9911  9912  9913  476  9914 0
 9911  9912  9913  476 -9915 0
 9911  9912  9913  476  9916 0

c  -1-1 --> -2
c    ( b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧  b^{7, 68}_0 ∧ -p_476) -> ( b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0)
c  in CNF:
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨  b^{7, 69}_2
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨  b^{7, 69}_1
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨  p_476 ∨ -b^{7, 69}_0
c  in DIMACS:
-9911  9912 -9913  476  9914 0
-9911  9912 -9913  476  9915 0
-9911  9912 -9913  476 -9916 0

c  -2-1 --> break 
c    ( b^{7, 68}_2 ∧  b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨  b^{7, 68}_0 ∨  p_476 ∨ break
c  in DIMACS:
-9911 -9912  9913  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 68}_2 ∧ -b^{7, 68}_1 ∧ -b^{7, 68}_0 ∧ true) 
c  in CNF:
c    -b^{7, 68}_2 ∨  b^{7, 68}_1 ∨  b^{7, 68}_0 ∨ false 
c  in DIMACS:
-9911  9912  9913  0

c  3 does not represent an automaton state.
c    -(-b^{7, 68}_2 ∧  b^{7, 68}_1 ∧  b^{7, 68}_0 ∧ true) 
c  in CNF:
c     b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ false 
c  in DIMACS:
 9911 -9912 -9913  0
c  -3 does not represent an automaton state.
c    -( b^{7, 68}_2 ∧  b^{7, 68}_1 ∧  b^{7, 68}_0 ∧ true) 
c  in CNF:
c    -b^{7, 68}_2 ∨ -b^{7, 68}_1 ∨ -b^{7, 68}_0 ∨ false 
c  in DIMACS:
-9911 -9912 -9913  0

c i = 69
c  -2+1 --> -1
c    ( b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧  p_483) -> ( b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0)
c  in CNF:
c    -b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨  b^{7, 70}_2
c    -b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_1
c    -b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨  b^{7, 70}_0
c  in DIMACS:
-9914 -9915  9916 -483  9917 0
-9914 -9915  9916 -483 -9918 0
-9914 -9915  9916 -483  9919 0

c  -1+1 --> 0
c    ( b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0 ∧  p_483) -> (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧ -b^{7, 70}_0)
c  in CNF:
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_2
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_1
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_0
c  in DIMACS:
-9914  9915 -9916 -483 -9917 0
-9914  9915 -9916 -483 -9918 0
-9914  9915 -9916 -483 -9919 0

c  0+1 --> 1
c    (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧  p_483) -> (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0)
c  in CNF:
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_2
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_1
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨  b^{7, 70}_0
c  in DIMACS:
 9914  9915  9916 -483 -9917 0
 9914  9915  9916 -483 -9918 0
 9914  9915  9916 -483  9919 0

c  1+1 --> 2
c    (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0 ∧  p_483) -> (-b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0)
c  in CNF:
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_2
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨  b^{7, 70}_1
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ -p_483 ∨ -b^{7, 70}_0
c  in DIMACS:
 9914  9915 -9916 -483 -9917 0
 9914  9915 -9916 -483  9918 0
 9914  9915 -9916 -483 -9919 0

c  2+1 --> break 
c    (-b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧  p_483) -> break
c  in CNF:
c     b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 9914 -9915  9916 -483 1162 0


c  2-1 --> 1
c    (-b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧ -p_483) -> (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0)
c  in CNF:
c     b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_2
c     b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_1
c     b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨  b^{7, 70}_0
c  in DIMACS:
 9914 -9915  9916  483 -9917 0
 9914 -9915  9916  483 -9918 0
 9914 -9915  9916  483  9919 0

c  1-1 --> 0
c    (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0 ∧ -p_483) -> (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧ -b^{7, 70}_0)
c  in CNF:
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_2
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_1
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_0
c  in DIMACS:
 9914  9915 -9916  483 -9917 0
 9914  9915 -9916  483 -9918 0
 9914  9915 -9916  483 -9919 0

c  0-1 --> -1
c    (-b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧ -p_483) -> ( b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0)
c  in CNF:
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨  b^{7, 70}_2
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_1
c     b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨  b^{7, 70}_0
c  in DIMACS:
 9914  9915  9916  483  9917 0
 9914  9915  9916  483 -9918 0
 9914  9915  9916  483  9919 0

c  -1-1 --> -2
c    ( b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧  b^{7, 69}_0 ∧ -p_483) -> ( b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0)
c  in CNF:
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨  b^{7, 70}_2
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨  b^{7, 70}_1
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨  p_483 ∨ -b^{7, 70}_0
c  in DIMACS:
-9914  9915 -9916  483  9917 0
-9914  9915 -9916  483  9918 0
-9914  9915 -9916  483 -9919 0

c  -2-1 --> break 
c    ( b^{7, 69}_2 ∧  b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨  b^{7, 69}_0 ∨  p_483 ∨ break
c  in DIMACS:
-9914 -9915  9916  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 69}_2 ∧ -b^{7, 69}_1 ∧ -b^{7, 69}_0 ∧ true) 
c  in CNF:
c    -b^{7, 69}_2 ∨  b^{7, 69}_1 ∨  b^{7, 69}_0 ∨ false 
c  in DIMACS:
-9914  9915  9916  0

c  3 does not represent an automaton state.
c    -(-b^{7, 69}_2 ∧  b^{7, 69}_1 ∧  b^{7, 69}_0 ∧ true) 
c  in CNF:
c     b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ false 
c  in DIMACS:
 9914 -9915 -9916  0
c  -3 does not represent an automaton state.
c    -( b^{7, 69}_2 ∧  b^{7, 69}_1 ∧  b^{7, 69}_0 ∧ true) 
c  in CNF:
c    -b^{7, 69}_2 ∨ -b^{7, 69}_1 ∨ -b^{7, 69}_0 ∨ false 
c  in DIMACS:
-9914 -9915 -9916  0

c i = 70
c  -2+1 --> -1
c    ( b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧  p_490) -> ( b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0)
c  in CNF:
c    -b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨  b^{7, 71}_2
c    -b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_1
c    -b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨  b^{7, 71}_0
c  in DIMACS:
-9917 -9918  9919 -490  9920 0
-9917 -9918  9919 -490 -9921 0
-9917 -9918  9919 -490  9922 0

c  -1+1 --> 0
c    ( b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0 ∧  p_490) -> (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧ -b^{7, 71}_0)
c  in CNF:
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_2
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_1
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_0
c  in DIMACS:
-9917  9918 -9919 -490 -9920 0
-9917  9918 -9919 -490 -9921 0
-9917  9918 -9919 -490 -9922 0

c  0+1 --> 1
c    (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧  p_490) -> (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0)
c  in CNF:
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_2
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_1
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨  b^{7, 71}_0
c  in DIMACS:
 9917  9918  9919 -490 -9920 0
 9917  9918  9919 -490 -9921 0
 9917  9918  9919 -490  9922 0

c  1+1 --> 2
c    (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0 ∧  p_490) -> (-b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0)
c  in CNF:
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_2
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨  b^{7, 71}_1
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ -p_490 ∨ -b^{7, 71}_0
c  in DIMACS:
 9917  9918 -9919 -490 -9920 0
 9917  9918 -9919 -490  9921 0
 9917  9918 -9919 -490 -9922 0

c  2+1 --> break 
c    (-b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧  p_490) -> break
c  in CNF:
c     b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 9917 -9918  9919 -490 1162 0


c  2-1 --> 1
c    (-b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧ -p_490) -> (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0)
c  in CNF:
c     b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_2
c     b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_1
c     b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨  b^{7, 71}_0
c  in DIMACS:
 9917 -9918  9919  490 -9920 0
 9917 -9918  9919  490 -9921 0
 9917 -9918  9919  490  9922 0

c  1-1 --> 0
c    (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0 ∧ -p_490) -> (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧ -b^{7, 71}_0)
c  in CNF:
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_2
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_1
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_0
c  in DIMACS:
 9917  9918 -9919  490 -9920 0
 9917  9918 -9919  490 -9921 0
 9917  9918 -9919  490 -9922 0

c  0-1 --> -1
c    (-b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧ -p_490) -> ( b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0)
c  in CNF:
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨  b^{7, 71}_2
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_1
c     b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨  b^{7, 71}_0
c  in DIMACS:
 9917  9918  9919  490  9920 0
 9917  9918  9919  490 -9921 0
 9917  9918  9919  490  9922 0

c  -1-1 --> -2
c    ( b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧  b^{7, 70}_0 ∧ -p_490) -> ( b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0)
c  in CNF:
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨  b^{7, 71}_2
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨  b^{7, 71}_1
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨  p_490 ∨ -b^{7, 71}_0
c  in DIMACS:
-9917  9918 -9919  490  9920 0
-9917  9918 -9919  490  9921 0
-9917  9918 -9919  490 -9922 0

c  -2-1 --> break 
c    ( b^{7, 70}_2 ∧  b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨  b^{7, 70}_0 ∨  p_490 ∨ break
c  in DIMACS:
-9917 -9918  9919  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 70}_2 ∧ -b^{7, 70}_1 ∧ -b^{7, 70}_0 ∧ true) 
c  in CNF:
c    -b^{7, 70}_2 ∨  b^{7, 70}_1 ∨  b^{7, 70}_0 ∨ false 
c  in DIMACS:
-9917  9918  9919  0

c  3 does not represent an automaton state.
c    -(-b^{7, 70}_2 ∧  b^{7, 70}_1 ∧  b^{7, 70}_0 ∧ true) 
c  in CNF:
c     b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ false 
c  in DIMACS:
 9917 -9918 -9919  0
c  -3 does not represent an automaton state.
c    -( b^{7, 70}_2 ∧  b^{7, 70}_1 ∧  b^{7, 70}_0 ∧ true) 
c  in CNF:
c    -b^{7, 70}_2 ∨ -b^{7, 70}_1 ∨ -b^{7, 70}_0 ∨ false 
c  in DIMACS:
-9917 -9918 -9919  0

c i = 71
c  -2+1 --> -1
c    ( b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧  p_497) -> ( b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0)
c  in CNF:
c    -b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨  b^{7, 72}_2
c    -b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_1
c    -b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨  b^{7, 72}_0
c  in DIMACS:
-9920 -9921  9922 -497  9923 0
-9920 -9921  9922 -497 -9924 0
-9920 -9921  9922 -497  9925 0

c  -1+1 --> 0
c    ( b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0 ∧  p_497) -> (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧ -b^{7, 72}_0)
c  in CNF:
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_2
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_1
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_0
c  in DIMACS:
-9920  9921 -9922 -497 -9923 0
-9920  9921 -9922 -497 -9924 0
-9920  9921 -9922 -497 -9925 0

c  0+1 --> 1
c    (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧  p_497) -> (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0)
c  in CNF:
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_2
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_1
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨  b^{7, 72}_0
c  in DIMACS:
 9920  9921  9922 -497 -9923 0
 9920  9921  9922 -497 -9924 0
 9920  9921  9922 -497  9925 0

c  1+1 --> 2
c    (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0 ∧  p_497) -> (-b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0)
c  in CNF:
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_2
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨  b^{7, 72}_1
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ -p_497 ∨ -b^{7, 72}_0
c  in DIMACS:
 9920  9921 -9922 -497 -9923 0
 9920  9921 -9922 -497  9924 0
 9920  9921 -9922 -497 -9925 0

c  2+1 --> break 
c    (-b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧  p_497) -> break
c  in CNF:
c     b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ -p_497 ∨ break
c  in DIMACS:
 9920 -9921  9922 -497 1162 0


c  2-1 --> 1
c    (-b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧ -p_497) -> (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0)
c  in CNF:
c     b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_2
c     b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_1
c     b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨  b^{7, 72}_0
c  in DIMACS:
 9920 -9921  9922  497 -9923 0
 9920 -9921  9922  497 -9924 0
 9920 -9921  9922  497  9925 0

c  1-1 --> 0
c    (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0 ∧ -p_497) -> (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧ -b^{7, 72}_0)
c  in CNF:
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_2
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_1
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_0
c  in DIMACS:
 9920  9921 -9922  497 -9923 0
 9920  9921 -9922  497 -9924 0
 9920  9921 -9922  497 -9925 0

c  0-1 --> -1
c    (-b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧ -p_497) -> ( b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0)
c  in CNF:
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨  b^{7, 72}_2
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_1
c     b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨  b^{7, 72}_0
c  in DIMACS:
 9920  9921  9922  497  9923 0
 9920  9921  9922  497 -9924 0
 9920  9921  9922  497  9925 0

c  -1-1 --> -2
c    ( b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧  b^{7, 71}_0 ∧ -p_497) -> ( b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0)
c  in CNF:
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨  b^{7, 72}_2
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨  b^{7, 72}_1
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨  p_497 ∨ -b^{7, 72}_0
c  in DIMACS:
-9920  9921 -9922  497  9923 0
-9920  9921 -9922  497  9924 0
-9920  9921 -9922  497 -9925 0

c  -2-1 --> break 
c    ( b^{7, 71}_2 ∧  b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧ -p_497) -> break
c  in CNF:
c    -b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨  b^{7, 71}_0 ∨  p_497 ∨ break
c  in DIMACS:
-9920 -9921  9922  497 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 71}_2 ∧ -b^{7, 71}_1 ∧ -b^{7, 71}_0 ∧ true) 
c  in CNF:
c    -b^{7, 71}_2 ∨  b^{7, 71}_1 ∨  b^{7, 71}_0 ∨ false 
c  in DIMACS:
-9920  9921  9922  0

c  3 does not represent an automaton state.
c    -(-b^{7, 71}_2 ∧  b^{7, 71}_1 ∧  b^{7, 71}_0 ∧ true) 
c  in CNF:
c     b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ false 
c  in DIMACS:
 9920 -9921 -9922  0
c  -3 does not represent an automaton state.
c    -( b^{7, 71}_2 ∧  b^{7, 71}_1 ∧  b^{7, 71}_0 ∧ true) 
c  in CNF:
c    -b^{7, 71}_2 ∨ -b^{7, 71}_1 ∨ -b^{7, 71}_0 ∨ false 
c  in DIMACS:
-9920 -9921 -9922  0

c i = 72
c  -2+1 --> -1
c    ( b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧  p_504) -> ( b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0)
c  in CNF:
c    -b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨  b^{7, 73}_2
c    -b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_1
c    -b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨  b^{7, 73}_0
c  in DIMACS:
-9923 -9924  9925 -504  9926 0
-9923 -9924  9925 -504 -9927 0
-9923 -9924  9925 -504  9928 0

c  -1+1 --> 0
c    ( b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0 ∧  p_504) -> (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧ -b^{7, 73}_0)
c  in CNF:
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_2
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_1
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_0
c  in DIMACS:
-9923  9924 -9925 -504 -9926 0
-9923  9924 -9925 -504 -9927 0
-9923  9924 -9925 -504 -9928 0

c  0+1 --> 1
c    (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧  p_504) -> (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0)
c  in CNF:
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_2
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_1
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨  b^{7, 73}_0
c  in DIMACS:
 9923  9924  9925 -504 -9926 0
 9923  9924  9925 -504 -9927 0
 9923  9924  9925 -504  9928 0

c  1+1 --> 2
c    (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0 ∧  p_504) -> (-b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0)
c  in CNF:
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_2
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨  b^{7, 73}_1
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ -p_504 ∨ -b^{7, 73}_0
c  in DIMACS:
 9923  9924 -9925 -504 -9926 0
 9923  9924 -9925 -504  9927 0
 9923  9924 -9925 -504 -9928 0

c  2+1 --> break 
c    (-b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧  p_504) -> break
c  in CNF:
c     b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 9923 -9924  9925 -504 1162 0


c  2-1 --> 1
c    (-b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧ -p_504) -> (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0)
c  in CNF:
c     b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_2
c     b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_1
c     b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨  b^{7, 73}_0
c  in DIMACS:
 9923 -9924  9925  504 -9926 0
 9923 -9924  9925  504 -9927 0
 9923 -9924  9925  504  9928 0

c  1-1 --> 0
c    (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0 ∧ -p_504) -> (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧ -b^{7, 73}_0)
c  in CNF:
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_2
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_1
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_0
c  in DIMACS:
 9923  9924 -9925  504 -9926 0
 9923  9924 -9925  504 -9927 0
 9923  9924 -9925  504 -9928 0

c  0-1 --> -1
c    (-b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧ -p_504) -> ( b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0)
c  in CNF:
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨  b^{7, 73}_2
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_1
c     b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨  b^{7, 73}_0
c  in DIMACS:
 9923  9924  9925  504  9926 0
 9923  9924  9925  504 -9927 0
 9923  9924  9925  504  9928 0

c  -1-1 --> -2
c    ( b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧  b^{7, 72}_0 ∧ -p_504) -> ( b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0)
c  in CNF:
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨  b^{7, 73}_2
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨  b^{7, 73}_1
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨  p_504 ∨ -b^{7, 73}_0
c  in DIMACS:
-9923  9924 -9925  504  9926 0
-9923  9924 -9925  504  9927 0
-9923  9924 -9925  504 -9928 0

c  -2-1 --> break 
c    ( b^{7, 72}_2 ∧  b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨  b^{7, 72}_0 ∨  p_504 ∨ break
c  in DIMACS:
-9923 -9924  9925  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 72}_2 ∧ -b^{7, 72}_1 ∧ -b^{7, 72}_0 ∧ true) 
c  in CNF:
c    -b^{7, 72}_2 ∨  b^{7, 72}_1 ∨  b^{7, 72}_0 ∨ false 
c  in DIMACS:
-9923  9924  9925  0

c  3 does not represent an automaton state.
c    -(-b^{7, 72}_2 ∧  b^{7, 72}_1 ∧  b^{7, 72}_0 ∧ true) 
c  in CNF:
c     b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ false 
c  in DIMACS:
 9923 -9924 -9925  0
c  -3 does not represent an automaton state.
c    -( b^{7, 72}_2 ∧  b^{7, 72}_1 ∧  b^{7, 72}_0 ∧ true) 
c  in CNF:
c    -b^{7, 72}_2 ∨ -b^{7, 72}_1 ∨ -b^{7, 72}_0 ∨ false 
c  in DIMACS:
-9923 -9924 -9925  0

c i = 73
c  -2+1 --> -1
c    ( b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧  p_511) -> ( b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0)
c  in CNF:
c    -b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨  b^{7, 74}_2
c    -b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_1
c    -b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨  b^{7, 74}_0
c  in DIMACS:
-9926 -9927  9928 -511  9929 0
-9926 -9927  9928 -511 -9930 0
-9926 -9927  9928 -511  9931 0

c  -1+1 --> 0
c    ( b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0 ∧  p_511) -> (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧ -b^{7, 74}_0)
c  in CNF:
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_2
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_1
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_0
c  in DIMACS:
-9926  9927 -9928 -511 -9929 0
-9926  9927 -9928 -511 -9930 0
-9926  9927 -9928 -511 -9931 0

c  0+1 --> 1
c    (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧  p_511) -> (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0)
c  in CNF:
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_2
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_1
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨  b^{7, 74}_0
c  in DIMACS:
 9926  9927  9928 -511 -9929 0
 9926  9927  9928 -511 -9930 0
 9926  9927  9928 -511  9931 0

c  1+1 --> 2
c    (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0 ∧  p_511) -> (-b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0)
c  in CNF:
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_2
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨  b^{7, 74}_1
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ -p_511 ∨ -b^{7, 74}_0
c  in DIMACS:
 9926  9927 -9928 -511 -9929 0
 9926  9927 -9928 -511  9930 0
 9926  9927 -9928 -511 -9931 0

c  2+1 --> break 
c    (-b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧  p_511) -> break
c  in CNF:
c     b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ -p_511 ∨ break
c  in DIMACS:
 9926 -9927  9928 -511 1162 0


c  2-1 --> 1
c    (-b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧ -p_511) -> (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0)
c  in CNF:
c     b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_2
c     b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_1
c     b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨  b^{7, 74}_0
c  in DIMACS:
 9926 -9927  9928  511 -9929 0
 9926 -9927  9928  511 -9930 0
 9926 -9927  9928  511  9931 0

c  1-1 --> 0
c    (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0 ∧ -p_511) -> (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧ -b^{7, 74}_0)
c  in CNF:
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_2
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_1
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_0
c  in DIMACS:
 9926  9927 -9928  511 -9929 0
 9926  9927 -9928  511 -9930 0
 9926  9927 -9928  511 -9931 0

c  0-1 --> -1
c    (-b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧ -p_511) -> ( b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0)
c  in CNF:
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨  b^{7, 74}_2
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_1
c     b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨  b^{7, 74}_0
c  in DIMACS:
 9926  9927  9928  511  9929 0
 9926  9927  9928  511 -9930 0
 9926  9927  9928  511  9931 0

c  -1-1 --> -2
c    ( b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧  b^{7, 73}_0 ∧ -p_511) -> ( b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0)
c  in CNF:
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨  b^{7, 74}_2
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨  b^{7, 74}_1
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨  p_511 ∨ -b^{7, 74}_0
c  in DIMACS:
-9926  9927 -9928  511  9929 0
-9926  9927 -9928  511  9930 0
-9926  9927 -9928  511 -9931 0

c  -2-1 --> break 
c    ( b^{7, 73}_2 ∧  b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧ -p_511) -> break
c  in CNF:
c    -b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨  b^{7, 73}_0 ∨  p_511 ∨ break
c  in DIMACS:
-9926 -9927  9928  511 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 73}_2 ∧ -b^{7, 73}_1 ∧ -b^{7, 73}_0 ∧ true) 
c  in CNF:
c    -b^{7, 73}_2 ∨  b^{7, 73}_1 ∨  b^{7, 73}_0 ∨ false 
c  in DIMACS:
-9926  9927  9928  0

c  3 does not represent an automaton state.
c    -(-b^{7, 73}_2 ∧  b^{7, 73}_1 ∧  b^{7, 73}_0 ∧ true) 
c  in CNF:
c     b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ false 
c  in DIMACS:
 9926 -9927 -9928  0
c  -3 does not represent an automaton state.
c    -( b^{7, 73}_2 ∧  b^{7, 73}_1 ∧  b^{7, 73}_0 ∧ true) 
c  in CNF:
c    -b^{7, 73}_2 ∨ -b^{7, 73}_1 ∨ -b^{7, 73}_0 ∨ false 
c  in DIMACS:
-9926 -9927 -9928  0

c i = 74
c  -2+1 --> -1
c    ( b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧  p_518) -> ( b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0)
c  in CNF:
c    -b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨  b^{7, 75}_2
c    -b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_1
c    -b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨  b^{7, 75}_0
c  in DIMACS:
-9929 -9930  9931 -518  9932 0
-9929 -9930  9931 -518 -9933 0
-9929 -9930  9931 -518  9934 0

c  -1+1 --> 0
c    ( b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0 ∧  p_518) -> (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧ -b^{7, 75}_0)
c  in CNF:
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_2
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_1
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_0
c  in DIMACS:
-9929  9930 -9931 -518 -9932 0
-9929  9930 -9931 -518 -9933 0
-9929  9930 -9931 -518 -9934 0

c  0+1 --> 1
c    (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧  p_518) -> (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0)
c  in CNF:
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_2
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_1
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨  b^{7, 75}_0
c  in DIMACS:
 9929  9930  9931 -518 -9932 0
 9929  9930  9931 -518 -9933 0
 9929  9930  9931 -518  9934 0

c  1+1 --> 2
c    (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0 ∧  p_518) -> (-b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0)
c  in CNF:
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_2
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨  b^{7, 75}_1
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ -p_518 ∨ -b^{7, 75}_0
c  in DIMACS:
 9929  9930 -9931 -518 -9932 0
 9929  9930 -9931 -518  9933 0
 9929  9930 -9931 -518 -9934 0

c  2+1 --> break 
c    (-b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧  p_518) -> break
c  in CNF:
c     b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 9929 -9930  9931 -518 1162 0


c  2-1 --> 1
c    (-b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧ -p_518) -> (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0)
c  in CNF:
c     b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_2
c     b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_1
c     b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨  b^{7, 75}_0
c  in DIMACS:
 9929 -9930  9931  518 -9932 0
 9929 -9930  9931  518 -9933 0
 9929 -9930  9931  518  9934 0

c  1-1 --> 0
c    (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0 ∧ -p_518) -> (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧ -b^{7, 75}_0)
c  in CNF:
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_2
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_1
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_0
c  in DIMACS:
 9929  9930 -9931  518 -9932 0
 9929  9930 -9931  518 -9933 0
 9929  9930 -9931  518 -9934 0

c  0-1 --> -1
c    (-b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧ -p_518) -> ( b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0)
c  in CNF:
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨  b^{7, 75}_2
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_1
c     b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨  b^{7, 75}_0
c  in DIMACS:
 9929  9930  9931  518  9932 0
 9929  9930  9931  518 -9933 0
 9929  9930  9931  518  9934 0

c  -1-1 --> -2
c    ( b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧  b^{7, 74}_0 ∧ -p_518) -> ( b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0)
c  in CNF:
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨  b^{7, 75}_2
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨  b^{7, 75}_1
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨  p_518 ∨ -b^{7, 75}_0
c  in DIMACS:
-9929  9930 -9931  518  9932 0
-9929  9930 -9931  518  9933 0
-9929  9930 -9931  518 -9934 0

c  -2-1 --> break 
c    ( b^{7, 74}_2 ∧  b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨  b^{7, 74}_0 ∨  p_518 ∨ break
c  in DIMACS:
-9929 -9930  9931  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 74}_2 ∧ -b^{7, 74}_1 ∧ -b^{7, 74}_0 ∧ true) 
c  in CNF:
c    -b^{7, 74}_2 ∨  b^{7, 74}_1 ∨  b^{7, 74}_0 ∨ false 
c  in DIMACS:
-9929  9930  9931  0

c  3 does not represent an automaton state.
c    -(-b^{7, 74}_2 ∧  b^{7, 74}_1 ∧  b^{7, 74}_0 ∧ true) 
c  in CNF:
c     b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ false 
c  in DIMACS:
 9929 -9930 -9931  0
c  -3 does not represent an automaton state.
c    -( b^{7, 74}_2 ∧  b^{7, 74}_1 ∧  b^{7, 74}_0 ∧ true) 
c  in CNF:
c    -b^{7, 74}_2 ∨ -b^{7, 74}_1 ∨ -b^{7, 74}_0 ∨ false 
c  in DIMACS:
-9929 -9930 -9931  0

c i = 75
c  -2+1 --> -1
c    ( b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧  p_525) -> ( b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0)
c  in CNF:
c    -b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨  b^{7, 76}_2
c    -b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_1
c    -b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨  b^{7, 76}_0
c  in DIMACS:
-9932 -9933  9934 -525  9935 0
-9932 -9933  9934 -525 -9936 0
-9932 -9933  9934 -525  9937 0

c  -1+1 --> 0
c    ( b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0 ∧  p_525) -> (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧ -b^{7, 76}_0)
c  in CNF:
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_2
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_1
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_0
c  in DIMACS:
-9932  9933 -9934 -525 -9935 0
-9932  9933 -9934 -525 -9936 0
-9932  9933 -9934 -525 -9937 0

c  0+1 --> 1
c    (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧  p_525) -> (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0)
c  in CNF:
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_2
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_1
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨  b^{7, 76}_0
c  in DIMACS:
 9932  9933  9934 -525 -9935 0
 9932  9933  9934 -525 -9936 0
 9932  9933  9934 -525  9937 0

c  1+1 --> 2
c    (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0 ∧  p_525) -> (-b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0)
c  in CNF:
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_2
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨  b^{7, 76}_1
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ -p_525 ∨ -b^{7, 76}_0
c  in DIMACS:
 9932  9933 -9934 -525 -9935 0
 9932  9933 -9934 -525  9936 0
 9932  9933 -9934 -525 -9937 0

c  2+1 --> break 
c    (-b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧  p_525) -> break
c  in CNF:
c     b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 9932 -9933  9934 -525 1162 0


c  2-1 --> 1
c    (-b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧ -p_525) -> (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0)
c  in CNF:
c     b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_2
c     b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_1
c     b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨  b^{7, 76}_0
c  in DIMACS:
 9932 -9933  9934  525 -9935 0
 9932 -9933  9934  525 -9936 0
 9932 -9933  9934  525  9937 0

c  1-1 --> 0
c    (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0 ∧ -p_525) -> (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧ -b^{7, 76}_0)
c  in CNF:
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_2
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_1
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_0
c  in DIMACS:
 9932  9933 -9934  525 -9935 0
 9932  9933 -9934  525 -9936 0
 9932  9933 -9934  525 -9937 0

c  0-1 --> -1
c    (-b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧ -p_525) -> ( b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0)
c  in CNF:
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨  b^{7, 76}_2
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_1
c     b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨  b^{7, 76}_0
c  in DIMACS:
 9932  9933  9934  525  9935 0
 9932  9933  9934  525 -9936 0
 9932  9933  9934  525  9937 0

c  -1-1 --> -2
c    ( b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧  b^{7, 75}_0 ∧ -p_525) -> ( b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0)
c  in CNF:
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨  b^{7, 76}_2
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨  b^{7, 76}_1
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨  p_525 ∨ -b^{7, 76}_0
c  in DIMACS:
-9932  9933 -9934  525  9935 0
-9932  9933 -9934  525  9936 0
-9932  9933 -9934  525 -9937 0

c  -2-1 --> break 
c    ( b^{7, 75}_2 ∧  b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨  b^{7, 75}_0 ∨  p_525 ∨ break
c  in DIMACS:
-9932 -9933  9934  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 75}_2 ∧ -b^{7, 75}_1 ∧ -b^{7, 75}_0 ∧ true) 
c  in CNF:
c    -b^{7, 75}_2 ∨  b^{7, 75}_1 ∨  b^{7, 75}_0 ∨ false 
c  in DIMACS:
-9932  9933  9934  0

c  3 does not represent an automaton state.
c    -(-b^{7, 75}_2 ∧  b^{7, 75}_1 ∧  b^{7, 75}_0 ∧ true) 
c  in CNF:
c     b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ false 
c  in DIMACS:
 9932 -9933 -9934  0
c  -3 does not represent an automaton state.
c    -( b^{7, 75}_2 ∧  b^{7, 75}_1 ∧  b^{7, 75}_0 ∧ true) 
c  in CNF:
c    -b^{7, 75}_2 ∨ -b^{7, 75}_1 ∨ -b^{7, 75}_0 ∨ false 
c  in DIMACS:
-9932 -9933 -9934  0

c i = 76
c  -2+1 --> -1
c    ( b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧  p_532) -> ( b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0)
c  in CNF:
c    -b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨  b^{7, 77}_2
c    -b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_1
c    -b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨  b^{7, 77}_0
c  in DIMACS:
-9935 -9936  9937 -532  9938 0
-9935 -9936  9937 -532 -9939 0
-9935 -9936  9937 -532  9940 0

c  -1+1 --> 0
c    ( b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0 ∧  p_532) -> (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧ -b^{7, 77}_0)
c  in CNF:
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_2
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_1
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_0
c  in DIMACS:
-9935  9936 -9937 -532 -9938 0
-9935  9936 -9937 -532 -9939 0
-9935  9936 -9937 -532 -9940 0

c  0+1 --> 1
c    (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧  p_532) -> (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0)
c  in CNF:
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_2
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_1
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨  b^{7, 77}_0
c  in DIMACS:
 9935  9936  9937 -532 -9938 0
 9935  9936  9937 -532 -9939 0
 9935  9936  9937 -532  9940 0

c  1+1 --> 2
c    (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0 ∧  p_532) -> (-b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0)
c  in CNF:
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_2
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨  b^{7, 77}_1
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ -p_532 ∨ -b^{7, 77}_0
c  in DIMACS:
 9935  9936 -9937 -532 -9938 0
 9935  9936 -9937 -532  9939 0
 9935  9936 -9937 -532 -9940 0

c  2+1 --> break 
c    (-b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧  p_532) -> break
c  in CNF:
c     b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 9935 -9936  9937 -532 1162 0


c  2-1 --> 1
c    (-b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧ -p_532) -> (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0)
c  in CNF:
c     b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_2
c     b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_1
c     b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨  b^{7, 77}_0
c  in DIMACS:
 9935 -9936  9937  532 -9938 0
 9935 -9936  9937  532 -9939 0
 9935 -9936  9937  532  9940 0

c  1-1 --> 0
c    (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0 ∧ -p_532) -> (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧ -b^{7, 77}_0)
c  in CNF:
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_2
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_1
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_0
c  in DIMACS:
 9935  9936 -9937  532 -9938 0
 9935  9936 -9937  532 -9939 0
 9935  9936 -9937  532 -9940 0

c  0-1 --> -1
c    (-b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧ -p_532) -> ( b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0)
c  in CNF:
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨  b^{7, 77}_2
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_1
c     b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨  b^{7, 77}_0
c  in DIMACS:
 9935  9936  9937  532  9938 0
 9935  9936  9937  532 -9939 0
 9935  9936  9937  532  9940 0

c  -1-1 --> -2
c    ( b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧  b^{7, 76}_0 ∧ -p_532) -> ( b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0)
c  in CNF:
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨  b^{7, 77}_2
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨  b^{7, 77}_1
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨  p_532 ∨ -b^{7, 77}_0
c  in DIMACS:
-9935  9936 -9937  532  9938 0
-9935  9936 -9937  532  9939 0
-9935  9936 -9937  532 -9940 0

c  -2-1 --> break 
c    ( b^{7, 76}_2 ∧  b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨  b^{7, 76}_0 ∨  p_532 ∨ break
c  in DIMACS:
-9935 -9936  9937  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 76}_2 ∧ -b^{7, 76}_1 ∧ -b^{7, 76}_0 ∧ true) 
c  in CNF:
c    -b^{7, 76}_2 ∨  b^{7, 76}_1 ∨  b^{7, 76}_0 ∨ false 
c  in DIMACS:
-9935  9936  9937  0

c  3 does not represent an automaton state.
c    -(-b^{7, 76}_2 ∧  b^{7, 76}_1 ∧  b^{7, 76}_0 ∧ true) 
c  in CNF:
c     b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ false 
c  in DIMACS:
 9935 -9936 -9937  0
c  -3 does not represent an automaton state.
c    -( b^{7, 76}_2 ∧  b^{7, 76}_1 ∧  b^{7, 76}_0 ∧ true) 
c  in CNF:
c    -b^{7, 76}_2 ∨ -b^{7, 76}_1 ∨ -b^{7, 76}_0 ∨ false 
c  in DIMACS:
-9935 -9936 -9937  0

c i = 77
c  -2+1 --> -1
c    ( b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧  p_539) -> ( b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0)
c  in CNF:
c    -b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨  b^{7, 78}_2
c    -b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_1
c    -b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨  b^{7, 78}_0
c  in DIMACS:
-9938 -9939  9940 -539  9941 0
-9938 -9939  9940 -539 -9942 0
-9938 -9939  9940 -539  9943 0

c  -1+1 --> 0
c    ( b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0 ∧  p_539) -> (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧ -b^{7, 78}_0)
c  in CNF:
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_2
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_1
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_0
c  in DIMACS:
-9938  9939 -9940 -539 -9941 0
-9938  9939 -9940 -539 -9942 0
-9938  9939 -9940 -539 -9943 0

c  0+1 --> 1
c    (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧  p_539) -> (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0)
c  in CNF:
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_2
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_1
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨  b^{7, 78}_0
c  in DIMACS:
 9938  9939  9940 -539 -9941 0
 9938  9939  9940 -539 -9942 0
 9938  9939  9940 -539  9943 0

c  1+1 --> 2
c    (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0 ∧  p_539) -> (-b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0)
c  in CNF:
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_2
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨  b^{7, 78}_1
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ -p_539 ∨ -b^{7, 78}_0
c  in DIMACS:
 9938  9939 -9940 -539 -9941 0
 9938  9939 -9940 -539  9942 0
 9938  9939 -9940 -539 -9943 0

c  2+1 --> break 
c    (-b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧  p_539) -> break
c  in CNF:
c     b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ -p_539 ∨ break
c  in DIMACS:
 9938 -9939  9940 -539 1162 0


c  2-1 --> 1
c    (-b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧ -p_539) -> (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0)
c  in CNF:
c     b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_2
c     b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_1
c     b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨  b^{7, 78}_0
c  in DIMACS:
 9938 -9939  9940  539 -9941 0
 9938 -9939  9940  539 -9942 0
 9938 -9939  9940  539  9943 0

c  1-1 --> 0
c    (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0 ∧ -p_539) -> (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧ -b^{7, 78}_0)
c  in CNF:
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_2
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_1
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_0
c  in DIMACS:
 9938  9939 -9940  539 -9941 0
 9938  9939 -9940  539 -9942 0
 9938  9939 -9940  539 -9943 0

c  0-1 --> -1
c    (-b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧ -p_539) -> ( b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0)
c  in CNF:
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨  b^{7, 78}_2
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_1
c     b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨  b^{7, 78}_0
c  in DIMACS:
 9938  9939  9940  539  9941 0
 9938  9939  9940  539 -9942 0
 9938  9939  9940  539  9943 0

c  -1-1 --> -2
c    ( b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧  b^{7, 77}_0 ∧ -p_539) -> ( b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0)
c  in CNF:
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨  b^{7, 78}_2
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨  b^{7, 78}_1
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨  p_539 ∨ -b^{7, 78}_0
c  in DIMACS:
-9938  9939 -9940  539  9941 0
-9938  9939 -9940  539  9942 0
-9938  9939 -9940  539 -9943 0

c  -2-1 --> break 
c    ( b^{7, 77}_2 ∧  b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧ -p_539) -> break
c  in CNF:
c    -b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨  b^{7, 77}_0 ∨  p_539 ∨ break
c  in DIMACS:
-9938 -9939  9940  539 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 77}_2 ∧ -b^{7, 77}_1 ∧ -b^{7, 77}_0 ∧ true) 
c  in CNF:
c    -b^{7, 77}_2 ∨  b^{7, 77}_1 ∨  b^{7, 77}_0 ∨ false 
c  in DIMACS:
-9938  9939  9940  0

c  3 does not represent an automaton state.
c    -(-b^{7, 77}_2 ∧  b^{7, 77}_1 ∧  b^{7, 77}_0 ∧ true) 
c  in CNF:
c     b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ false 
c  in DIMACS:
 9938 -9939 -9940  0
c  -3 does not represent an automaton state.
c    -( b^{7, 77}_2 ∧  b^{7, 77}_1 ∧  b^{7, 77}_0 ∧ true) 
c  in CNF:
c    -b^{7, 77}_2 ∨ -b^{7, 77}_1 ∨ -b^{7, 77}_0 ∨ false 
c  in DIMACS:
-9938 -9939 -9940  0

c i = 78
c  -2+1 --> -1
c    ( b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧  p_546) -> ( b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0)
c  in CNF:
c    -b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨  b^{7, 79}_2
c    -b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_1
c    -b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨  b^{7, 79}_0
c  in DIMACS:
-9941 -9942  9943 -546  9944 0
-9941 -9942  9943 -546 -9945 0
-9941 -9942  9943 -546  9946 0

c  -1+1 --> 0
c    ( b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0 ∧  p_546) -> (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧ -b^{7, 79}_0)
c  in CNF:
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_2
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_1
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_0
c  in DIMACS:
-9941  9942 -9943 -546 -9944 0
-9941  9942 -9943 -546 -9945 0
-9941  9942 -9943 -546 -9946 0

c  0+1 --> 1
c    (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧  p_546) -> (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0)
c  in CNF:
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_2
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_1
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨  b^{7, 79}_0
c  in DIMACS:
 9941  9942  9943 -546 -9944 0
 9941  9942  9943 -546 -9945 0
 9941  9942  9943 -546  9946 0

c  1+1 --> 2
c    (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0 ∧  p_546) -> (-b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0)
c  in CNF:
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_2
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨  b^{7, 79}_1
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ -p_546 ∨ -b^{7, 79}_0
c  in DIMACS:
 9941  9942 -9943 -546 -9944 0
 9941  9942 -9943 -546  9945 0
 9941  9942 -9943 -546 -9946 0

c  2+1 --> break 
c    (-b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧  p_546) -> break
c  in CNF:
c     b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 9941 -9942  9943 -546 1162 0


c  2-1 --> 1
c    (-b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧ -p_546) -> (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0)
c  in CNF:
c     b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_2
c     b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_1
c     b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨  b^{7, 79}_0
c  in DIMACS:
 9941 -9942  9943  546 -9944 0
 9941 -9942  9943  546 -9945 0
 9941 -9942  9943  546  9946 0

c  1-1 --> 0
c    (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0 ∧ -p_546) -> (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧ -b^{7, 79}_0)
c  in CNF:
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_2
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_1
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_0
c  in DIMACS:
 9941  9942 -9943  546 -9944 0
 9941  9942 -9943  546 -9945 0
 9941  9942 -9943  546 -9946 0

c  0-1 --> -1
c    (-b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧ -p_546) -> ( b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0)
c  in CNF:
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨  b^{7, 79}_2
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_1
c     b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨  b^{7, 79}_0
c  in DIMACS:
 9941  9942  9943  546  9944 0
 9941  9942  9943  546 -9945 0
 9941  9942  9943  546  9946 0

c  -1-1 --> -2
c    ( b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧  b^{7, 78}_0 ∧ -p_546) -> ( b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0)
c  in CNF:
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨  b^{7, 79}_2
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨  b^{7, 79}_1
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨  p_546 ∨ -b^{7, 79}_0
c  in DIMACS:
-9941  9942 -9943  546  9944 0
-9941  9942 -9943  546  9945 0
-9941  9942 -9943  546 -9946 0

c  -2-1 --> break 
c    ( b^{7, 78}_2 ∧  b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨  b^{7, 78}_0 ∨  p_546 ∨ break
c  in DIMACS:
-9941 -9942  9943  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 78}_2 ∧ -b^{7, 78}_1 ∧ -b^{7, 78}_0 ∧ true) 
c  in CNF:
c    -b^{7, 78}_2 ∨  b^{7, 78}_1 ∨  b^{7, 78}_0 ∨ false 
c  in DIMACS:
-9941  9942  9943  0

c  3 does not represent an automaton state.
c    -(-b^{7, 78}_2 ∧  b^{7, 78}_1 ∧  b^{7, 78}_0 ∧ true) 
c  in CNF:
c     b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ false 
c  in DIMACS:
 9941 -9942 -9943  0
c  -3 does not represent an automaton state.
c    -( b^{7, 78}_2 ∧  b^{7, 78}_1 ∧  b^{7, 78}_0 ∧ true) 
c  in CNF:
c    -b^{7, 78}_2 ∨ -b^{7, 78}_1 ∨ -b^{7, 78}_0 ∨ false 
c  in DIMACS:
-9941 -9942 -9943  0

c i = 79
c  -2+1 --> -1
c    ( b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧  p_553) -> ( b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0)
c  in CNF:
c    -b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨  b^{7, 80}_2
c    -b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_1
c    -b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨  b^{7, 80}_0
c  in DIMACS:
-9944 -9945  9946 -553  9947 0
-9944 -9945  9946 -553 -9948 0
-9944 -9945  9946 -553  9949 0

c  -1+1 --> 0
c    ( b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0 ∧  p_553) -> (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧ -b^{7, 80}_0)
c  in CNF:
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_2
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_1
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_0
c  in DIMACS:
-9944  9945 -9946 -553 -9947 0
-9944  9945 -9946 -553 -9948 0
-9944  9945 -9946 -553 -9949 0

c  0+1 --> 1
c    (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧  p_553) -> (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0)
c  in CNF:
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_2
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_1
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨  b^{7, 80}_0
c  in DIMACS:
 9944  9945  9946 -553 -9947 0
 9944  9945  9946 -553 -9948 0
 9944  9945  9946 -553  9949 0

c  1+1 --> 2
c    (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0 ∧  p_553) -> (-b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0)
c  in CNF:
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_2
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨  b^{7, 80}_1
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ -p_553 ∨ -b^{7, 80}_0
c  in DIMACS:
 9944  9945 -9946 -553 -9947 0
 9944  9945 -9946 -553  9948 0
 9944  9945 -9946 -553 -9949 0

c  2+1 --> break 
c    (-b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧  p_553) -> break
c  in CNF:
c     b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ -p_553 ∨ break
c  in DIMACS:
 9944 -9945  9946 -553 1162 0


c  2-1 --> 1
c    (-b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧ -p_553) -> (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0)
c  in CNF:
c     b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_2
c     b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_1
c     b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨  b^{7, 80}_0
c  in DIMACS:
 9944 -9945  9946  553 -9947 0
 9944 -9945  9946  553 -9948 0
 9944 -9945  9946  553  9949 0

c  1-1 --> 0
c    (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0 ∧ -p_553) -> (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧ -b^{7, 80}_0)
c  in CNF:
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_2
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_1
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_0
c  in DIMACS:
 9944  9945 -9946  553 -9947 0
 9944  9945 -9946  553 -9948 0
 9944  9945 -9946  553 -9949 0

c  0-1 --> -1
c    (-b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧ -p_553) -> ( b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0)
c  in CNF:
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨  b^{7, 80}_2
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_1
c     b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨  b^{7, 80}_0
c  in DIMACS:
 9944  9945  9946  553  9947 0
 9944  9945  9946  553 -9948 0
 9944  9945  9946  553  9949 0

c  -1-1 --> -2
c    ( b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧  b^{7, 79}_0 ∧ -p_553) -> ( b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0)
c  in CNF:
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨  b^{7, 80}_2
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨  b^{7, 80}_1
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨  p_553 ∨ -b^{7, 80}_0
c  in DIMACS:
-9944  9945 -9946  553  9947 0
-9944  9945 -9946  553  9948 0
-9944  9945 -9946  553 -9949 0

c  -2-1 --> break 
c    ( b^{7, 79}_2 ∧  b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧ -p_553) -> break
c  in CNF:
c    -b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨  b^{7, 79}_0 ∨  p_553 ∨ break
c  in DIMACS:
-9944 -9945  9946  553 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 79}_2 ∧ -b^{7, 79}_1 ∧ -b^{7, 79}_0 ∧ true) 
c  in CNF:
c    -b^{7, 79}_2 ∨  b^{7, 79}_1 ∨  b^{7, 79}_0 ∨ false 
c  in DIMACS:
-9944  9945  9946  0

c  3 does not represent an automaton state.
c    -(-b^{7, 79}_2 ∧  b^{7, 79}_1 ∧  b^{7, 79}_0 ∧ true) 
c  in CNF:
c     b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ false 
c  in DIMACS:
 9944 -9945 -9946  0
c  -3 does not represent an automaton state.
c    -( b^{7, 79}_2 ∧  b^{7, 79}_1 ∧  b^{7, 79}_0 ∧ true) 
c  in CNF:
c    -b^{7, 79}_2 ∨ -b^{7, 79}_1 ∨ -b^{7, 79}_0 ∨ false 
c  in DIMACS:
-9944 -9945 -9946  0

c i = 80
c  -2+1 --> -1
c    ( b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧  p_560) -> ( b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0)
c  in CNF:
c    -b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨  b^{7, 81}_2
c    -b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_1
c    -b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨  b^{7, 81}_0
c  in DIMACS:
-9947 -9948  9949 -560  9950 0
-9947 -9948  9949 -560 -9951 0
-9947 -9948  9949 -560  9952 0

c  -1+1 --> 0
c    ( b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0 ∧  p_560) -> (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧ -b^{7, 81}_0)
c  in CNF:
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_2
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_1
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_0
c  in DIMACS:
-9947  9948 -9949 -560 -9950 0
-9947  9948 -9949 -560 -9951 0
-9947  9948 -9949 -560 -9952 0

c  0+1 --> 1
c    (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧  p_560) -> (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0)
c  in CNF:
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_2
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_1
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨  b^{7, 81}_0
c  in DIMACS:
 9947  9948  9949 -560 -9950 0
 9947  9948  9949 -560 -9951 0
 9947  9948  9949 -560  9952 0

c  1+1 --> 2
c    (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0 ∧  p_560) -> (-b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0)
c  in CNF:
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_2
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨  b^{7, 81}_1
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ -p_560 ∨ -b^{7, 81}_0
c  in DIMACS:
 9947  9948 -9949 -560 -9950 0
 9947  9948 -9949 -560  9951 0
 9947  9948 -9949 -560 -9952 0

c  2+1 --> break 
c    (-b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧  p_560) -> break
c  in CNF:
c     b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 9947 -9948  9949 -560 1162 0


c  2-1 --> 1
c    (-b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧ -p_560) -> (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0)
c  in CNF:
c     b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_2
c     b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_1
c     b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨  b^{7, 81}_0
c  in DIMACS:
 9947 -9948  9949  560 -9950 0
 9947 -9948  9949  560 -9951 0
 9947 -9948  9949  560  9952 0

c  1-1 --> 0
c    (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0 ∧ -p_560) -> (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧ -b^{7, 81}_0)
c  in CNF:
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_2
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_1
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_0
c  in DIMACS:
 9947  9948 -9949  560 -9950 0
 9947  9948 -9949  560 -9951 0
 9947  9948 -9949  560 -9952 0

c  0-1 --> -1
c    (-b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧ -p_560) -> ( b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0)
c  in CNF:
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨  b^{7, 81}_2
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_1
c     b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨  b^{7, 81}_0
c  in DIMACS:
 9947  9948  9949  560  9950 0
 9947  9948  9949  560 -9951 0
 9947  9948  9949  560  9952 0

c  -1-1 --> -2
c    ( b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧  b^{7, 80}_0 ∧ -p_560) -> ( b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0)
c  in CNF:
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨  b^{7, 81}_2
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨  b^{7, 81}_1
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨  p_560 ∨ -b^{7, 81}_0
c  in DIMACS:
-9947  9948 -9949  560  9950 0
-9947  9948 -9949  560  9951 0
-9947  9948 -9949  560 -9952 0

c  -2-1 --> break 
c    ( b^{7, 80}_2 ∧  b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨  b^{7, 80}_0 ∨  p_560 ∨ break
c  in DIMACS:
-9947 -9948  9949  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 80}_2 ∧ -b^{7, 80}_1 ∧ -b^{7, 80}_0 ∧ true) 
c  in CNF:
c    -b^{7, 80}_2 ∨  b^{7, 80}_1 ∨  b^{7, 80}_0 ∨ false 
c  in DIMACS:
-9947  9948  9949  0

c  3 does not represent an automaton state.
c    -(-b^{7, 80}_2 ∧  b^{7, 80}_1 ∧  b^{7, 80}_0 ∧ true) 
c  in CNF:
c     b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ false 
c  in DIMACS:
 9947 -9948 -9949  0
c  -3 does not represent an automaton state.
c    -( b^{7, 80}_2 ∧  b^{7, 80}_1 ∧  b^{7, 80}_0 ∧ true) 
c  in CNF:
c    -b^{7, 80}_2 ∨ -b^{7, 80}_1 ∨ -b^{7, 80}_0 ∨ false 
c  in DIMACS:
-9947 -9948 -9949  0

c i = 81
c  -2+1 --> -1
c    ( b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧  p_567) -> ( b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0)
c  in CNF:
c    -b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨  b^{7, 82}_2
c    -b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_1
c    -b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨  b^{7, 82}_0
c  in DIMACS:
-9950 -9951  9952 -567  9953 0
-9950 -9951  9952 -567 -9954 0
-9950 -9951  9952 -567  9955 0

c  -1+1 --> 0
c    ( b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0 ∧  p_567) -> (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧ -b^{7, 82}_0)
c  in CNF:
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_2
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_1
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_0
c  in DIMACS:
-9950  9951 -9952 -567 -9953 0
-9950  9951 -9952 -567 -9954 0
-9950  9951 -9952 -567 -9955 0

c  0+1 --> 1
c    (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧  p_567) -> (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0)
c  in CNF:
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_2
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_1
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨  b^{7, 82}_0
c  in DIMACS:
 9950  9951  9952 -567 -9953 0
 9950  9951  9952 -567 -9954 0
 9950  9951  9952 -567  9955 0

c  1+1 --> 2
c    (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0 ∧  p_567) -> (-b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0)
c  in CNF:
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_2
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨  b^{7, 82}_1
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ -p_567 ∨ -b^{7, 82}_0
c  in DIMACS:
 9950  9951 -9952 -567 -9953 0
 9950  9951 -9952 -567  9954 0
 9950  9951 -9952 -567 -9955 0

c  2+1 --> break 
c    (-b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧  p_567) -> break
c  in CNF:
c     b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 9950 -9951  9952 -567 1162 0


c  2-1 --> 1
c    (-b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧ -p_567) -> (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0)
c  in CNF:
c     b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_2
c     b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_1
c     b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨  b^{7, 82}_0
c  in DIMACS:
 9950 -9951  9952  567 -9953 0
 9950 -9951  9952  567 -9954 0
 9950 -9951  9952  567  9955 0

c  1-1 --> 0
c    (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0 ∧ -p_567) -> (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧ -b^{7, 82}_0)
c  in CNF:
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_2
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_1
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_0
c  in DIMACS:
 9950  9951 -9952  567 -9953 0
 9950  9951 -9952  567 -9954 0
 9950  9951 -9952  567 -9955 0

c  0-1 --> -1
c    (-b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧ -p_567) -> ( b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0)
c  in CNF:
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨  b^{7, 82}_2
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_1
c     b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨  b^{7, 82}_0
c  in DIMACS:
 9950  9951  9952  567  9953 0
 9950  9951  9952  567 -9954 0
 9950  9951  9952  567  9955 0

c  -1-1 --> -2
c    ( b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧  b^{7, 81}_0 ∧ -p_567) -> ( b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0)
c  in CNF:
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨  b^{7, 82}_2
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨  b^{7, 82}_1
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨  p_567 ∨ -b^{7, 82}_0
c  in DIMACS:
-9950  9951 -9952  567  9953 0
-9950  9951 -9952  567  9954 0
-9950  9951 -9952  567 -9955 0

c  -2-1 --> break 
c    ( b^{7, 81}_2 ∧  b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨  b^{7, 81}_0 ∨  p_567 ∨ break
c  in DIMACS:
-9950 -9951  9952  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 81}_2 ∧ -b^{7, 81}_1 ∧ -b^{7, 81}_0 ∧ true) 
c  in CNF:
c    -b^{7, 81}_2 ∨  b^{7, 81}_1 ∨  b^{7, 81}_0 ∨ false 
c  in DIMACS:
-9950  9951  9952  0

c  3 does not represent an automaton state.
c    -(-b^{7, 81}_2 ∧  b^{7, 81}_1 ∧  b^{7, 81}_0 ∧ true) 
c  in CNF:
c     b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ false 
c  in DIMACS:
 9950 -9951 -9952  0
c  -3 does not represent an automaton state.
c    -( b^{7, 81}_2 ∧  b^{7, 81}_1 ∧  b^{7, 81}_0 ∧ true) 
c  in CNF:
c    -b^{7, 81}_2 ∨ -b^{7, 81}_1 ∨ -b^{7, 81}_0 ∨ false 
c  in DIMACS:
-9950 -9951 -9952  0

c i = 82
c  -2+1 --> -1
c    ( b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧  p_574) -> ( b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0)
c  in CNF:
c    -b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨  b^{7, 83}_2
c    -b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_1
c    -b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨  b^{7, 83}_0
c  in DIMACS:
-9953 -9954  9955 -574  9956 0
-9953 -9954  9955 -574 -9957 0
-9953 -9954  9955 -574  9958 0

c  -1+1 --> 0
c    ( b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0 ∧  p_574) -> (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧ -b^{7, 83}_0)
c  in CNF:
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_2
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_1
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_0
c  in DIMACS:
-9953  9954 -9955 -574 -9956 0
-9953  9954 -9955 -574 -9957 0
-9953  9954 -9955 -574 -9958 0

c  0+1 --> 1
c    (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧  p_574) -> (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0)
c  in CNF:
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_2
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_1
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨  b^{7, 83}_0
c  in DIMACS:
 9953  9954  9955 -574 -9956 0
 9953  9954  9955 -574 -9957 0
 9953  9954  9955 -574  9958 0

c  1+1 --> 2
c    (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0 ∧  p_574) -> (-b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0)
c  in CNF:
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_2
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨  b^{7, 83}_1
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ -p_574 ∨ -b^{7, 83}_0
c  in DIMACS:
 9953  9954 -9955 -574 -9956 0
 9953  9954 -9955 -574  9957 0
 9953  9954 -9955 -574 -9958 0

c  2+1 --> break 
c    (-b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧  p_574) -> break
c  in CNF:
c     b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 9953 -9954  9955 -574 1162 0


c  2-1 --> 1
c    (-b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧ -p_574) -> (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0)
c  in CNF:
c     b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_2
c     b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_1
c     b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨  b^{7, 83}_0
c  in DIMACS:
 9953 -9954  9955  574 -9956 0
 9953 -9954  9955  574 -9957 0
 9953 -9954  9955  574  9958 0

c  1-1 --> 0
c    (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0 ∧ -p_574) -> (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧ -b^{7, 83}_0)
c  in CNF:
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_2
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_1
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_0
c  in DIMACS:
 9953  9954 -9955  574 -9956 0
 9953  9954 -9955  574 -9957 0
 9953  9954 -9955  574 -9958 0

c  0-1 --> -1
c    (-b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧ -p_574) -> ( b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0)
c  in CNF:
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨  b^{7, 83}_2
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_1
c     b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨  b^{7, 83}_0
c  in DIMACS:
 9953  9954  9955  574  9956 0
 9953  9954  9955  574 -9957 0
 9953  9954  9955  574  9958 0

c  -1-1 --> -2
c    ( b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧  b^{7, 82}_0 ∧ -p_574) -> ( b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0)
c  in CNF:
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨  b^{7, 83}_2
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨  b^{7, 83}_1
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨  p_574 ∨ -b^{7, 83}_0
c  in DIMACS:
-9953  9954 -9955  574  9956 0
-9953  9954 -9955  574  9957 0
-9953  9954 -9955  574 -9958 0

c  -2-1 --> break 
c    ( b^{7, 82}_2 ∧  b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨  b^{7, 82}_0 ∨  p_574 ∨ break
c  in DIMACS:
-9953 -9954  9955  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 82}_2 ∧ -b^{7, 82}_1 ∧ -b^{7, 82}_0 ∧ true) 
c  in CNF:
c    -b^{7, 82}_2 ∨  b^{7, 82}_1 ∨  b^{7, 82}_0 ∨ false 
c  in DIMACS:
-9953  9954  9955  0

c  3 does not represent an automaton state.
c    -(-b^{7, 82}_2 ∧  b^{7, 82}_1 ∧  b^{7, 82}_0 ∧ true) 
c  in CNF:
c     b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ false 
c  in DIMACS:
 9953 -9954 -9955  0
c  -3 does not represent an automaton state.
c    -( b^{7, 82}_2 ∧  b^{7, 82}_1 ∧  b^{7, 82}_0 ∧ true) 
c  in CNF:
c    -b^{7, 82}_2 ∨ -b^{7, 82}_1 ∨ -b^{7, 82}_0 ∨ false 
c  in DIMACS:
-9953 -9954 -9955  0

c i = 83
c  -2+1 --> -1
c    ( b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧  p_581) -> ( b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0)
c  in CNF:
c    -b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨  b^{7, 84}_2
c    -b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_1
c    -b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨  b^{7, 84}_0
c  in DIMACS:
-9956 -9957  9958 -581  9959 0
-9956 -9957  9958 -581 -9960 0
-9956 -9957  9958 -581  9961 0

c  -1+1 --> 0
c    ( b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0 ∧  p_581) -> (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧ -b^{7, 84}_0)
c  in CNF:
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_2
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_1
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_0
c  in DIMACS:
-9956  9957 -9958 -581 -9959 0
-9956  9957 -9958 -581 -9960 0
-9956  9957 -9958 -581 -9961 0

c  0+1 --> 1
c    (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧  p_581) -> (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0)
c  in CNF:
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_2
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_1
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨  b^{7, 84}_0
c  in DIMACS:
 9956  9957  9958 -581 -9959 0
 9956  9957  9958 -581 -9960 0
 9956  9957  9958 -581  9961 0

c  1+1 --> 2
c    (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0 ∧  p_581) -> (-b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0)
c  in CNF:
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_2
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨  b^{7, 84}_1
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ -p_581 ∨ -b^{7, 84}_0
c  in DIMACS:
 9956  9957 -9958 -581 -9959 0
 9956  9957 -9958 -581  9960 0
 9956  9957 -9958 -581 -9961 0

c  2+1 --> break 
c    (-b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧  p_581) -> break
c  in CNF:
c     b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ -p_581 ∨ break
c  in DIMACS:
 9956 -9957  9958 -581 1162 0


c  2-1 --> 1
c    (-b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧ -p_581) -> (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0)
c  in CNF:
c     b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_2
c     b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_1
c     b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨  b^{7, 84}_0
c  in DIMACS:
 9956 -9957  9958  581 -9959 0
 9956 -9957  9958  581 -9960 0
 9956 -9957  9958  581  9961 0

c  1-1 --> 0
c    (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0 ∧ -p_581) -> (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧ -b^{7, 84}_0)
c  in CNF:
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_2
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_1
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_0
c  in DIMACS:
 9956  9957 -9958  581 -9959 0
 9956  9957 -9958  581 -9960 0
 9956  9957 -9958  581 -9961 0

c  0-1 --> -1
c    (-b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧ -p_581) -> ( b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0)
c  in CNF:
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨  b^{7, 84}_2
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_1
c     b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨  b^{7, 84}_0
c  in DIMACS:
 9956  9957  9958  581  9959 0
 9956  9957  9958  581 -9960 0
 9956  9957  9958  581  9961 0

c  -1-1 --> -2
c    ( b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧  b^{7, 83}_0 ∧ -p_581) -> ( b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0)
c  in CNF:
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨  b^{7, 84}_2
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨  b^{7, 84}_1
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨  p_581 ∨ -b^{7, 84}_0
c  in DIMACS:
-9956  9957 -9958  581  9959 0
-9956  9957 -9958  581  9960 0
-9956  9957 -9958  581 -9961 0

c  -2-1 --> break 
c    ( b^{7, 83}_2 ∧  b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧ -p_581) -> break
c  in CNF:
c    -b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨  b^{7, 83}_0 ∨  p_581 ∨ break
c  in DIMACS:
-9956 -9957  9958  581 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 83}_2 ∧ -b^{7, 83}_1 ∧ -b^{7, 83}_0 ∧ true) 
c  in CNF:
c    -b^{7, 83}_2 ∨  b^{7, 83}_1 ∨  b^{7, 83}_0 ∨ false 
c  in DIMACS:
-9956  9957  9958  0

c  3 does not represent an automaton state.
c    -(-b^{7, 83}_2 ∧  b^{7, 83}_1 ∧  b^{7, 83}_0 ∧ true) 
c  in CNF:
c     b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ false 
c  in DIMACS:
 9956 -9957 -9958  0
c  -3 does not represent an automaton state.
c    -( b^{7, 83}_2 ∧  b^{7, 83}_1 ∧  b^{7, 83}_0 ∧ true) 
c  in CNF:
c    -b^{7, 83}_2 ∨ -b^{7, 83}_1 ∨ -b^{7, 83}_0 ∨ false 
c  in DIMACS:
-9956 -9957 -9958  0

c i = 84
c  -2+1 --> -1
c    ( b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧  p_588) -> ( b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0)
c  in CNF:
c    -b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨  b^{7, 85}_2
c    -b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_1
c    -b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨  b^{7, 85}_0
c  in DIMACS:
-9959 -9960  9961 -588  9962 0
-9959 -9960  9961 -588 -9963 0
-9959 -9960  9961 -588  9964 0

c  -1+1 --> 0
c    ( b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0 ∧  p_588) -> (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧ -b^{7, 85}_0)
c  in CNF:
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_2
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_1
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_0
c  in DIMACS:
-9959  9960 -9961 -588 -9962 0
-9959  9960 -9961 -588 -9963 0
-9959  9960 -9961 -588 -9964 0

c  0+1 --> 1
c    (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧  p_588) -> (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0)
c  in CNF:
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_2
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_1
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨  b^{7, 85}_0
c  in DIMACS:
 9959  9960  9961 -588 -9962 0
 9959  9960  9961 -588 -9963 0
 9959  9960  9961 -588  9964 0

c  1+1 --> 2
c    (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0 ∧  p_588) -> (-b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0)
c  in CNF:
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_2
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨  b^{7, 85}_1
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ -p_588 ∨ -b^{7, 85}_0
c  in DIMACS:
 9959  9960 -9961 -588 -9962 0
 9959  9960 -9961 -588  9963 0
 9959  9960 -9961 -588 -9964 0

c  2+1 --> break 
c    (-b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧  p_588) -> break
c  in CNF:
c     b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 9959 -9960  9961 -588 1162 0


c  2-1 --> 1
c    (-b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧ -p_588) -> (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0)
c  in CNF:
c     b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_2
c     b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_1
c     b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨  b^{7, 85}_0
c  in DIMACS:
 9959 -9960  9961  588 -9962 0
 9959 -9960  9961  588 -9963 0
 9959 -9960  9961  588  9964 0

c  1-1 --> 0
c    (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0 ∧ -p_588) -> (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧ -b^{7, 85}_0)
c  in CNF:
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_2
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_1
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_0
c  in DIMACS:
 9959  9960 -9961  588 -9962 0
 9959  9960 -9961  588 -9963 0
 9959  9960 -9961  588 -9964 0

c  0-1 --> -1
c    (-b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧ -p_588) -> ( b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0)
c  in CNF:
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨  b^{7, 85}_2
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_1
c     b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨  b^{7, 85}_0
c  in DIMACS:
 9959  9960  9961  588  9962 0
 9959  9960  9961  588 -9963 0
 9959  9960  9961  588  9964 0

c  -1-1 --> -2
c    ( b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧  b^{7, 84}_0 ∧ -p_588) -> ( b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0)
c  in CNF:
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨  b^{7, 85}_2
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨  b^{7, 85}_1
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨  p_588 ∨ -b^{7, 85}_0
c  in DIMACS:
-9959  9960 -9961  588  9962 0
-9959  9960 -9961  588  9963 0
-9959  9960 -9961  588 -9964 0

c  -2-1 --> break 
c    ( b^{7, 84}_2 ∧  b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨  b^{7, 84}_0 ∨  p_588 ∨ break
c  in DIMACS:
-9959 -9960  9961  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 84}_2 ∧ -b^{7, 84}_1 ∧ -b^{7, 84}_0 ∧ true) 
c  in CNF:
c    -b^{7, 84}_2 ∨  b^{7, 84}_1 ∨  b^{7, 84}_0 ∨ false 
c  in DIMACS:
-9959  9960  9961  0

c  3 does not represent an automaton state.
c    -(-b^{7, 84}_2 ∧  b^{7, 84}_1 ∧  b^{7, 84}_0 ∧ true) 
c  in CNF:
c     b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ false 
c  in DIMACS:
 9959 -9960 -9961  0
c  -3 does not represent an automaton state.
c    -( b^{7, 84}_2 ∧  b^{7, 84}_1 ∧  b^{7, 84}_0 ∧ true) 
c  in CNF:
c    -b^{7, 84}_2 ∨ -b^{7, 84}_1 ∨ -b^{7, 84}_0 ∨ false 
c  in DIMACS:
-9959 -9960 -9961  0

c i = 85
c  -2+1 --> -1
c    ( b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧  p_595) -> ( b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0)
c  in CNF:
c    -b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨  b^{7, 86}_2
c    -b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_1
c    -b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨  b^{7, 86}_0
c  in DIMACS:
-9962 -9963  9964 -595  9965 0
-9962 -9963  9964 -595 -9966 0
-9962 -9963  9964 -595  9967 0

c  -1+1 --> 0
c    ( b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0 ∧  p_595) -> (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧ -b^{7, 86}_0)
c  in CNF:
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_2
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_1
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_0
c  in DIMACS:
-9962  9963 -9964 -595 -9965 0
-9962  9963 -9964 -595 -9966 0
-9962  9963 -9964 -595 -9967 0

c  0+1 --> 1
c    (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧  p_595) -> (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0)
c  in CNF:
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_2
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_1
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨  b^{7, 86}_0
c  in DIMACS:
 9962  9963  9964 -595 -9965 0
 9962  9963  9964 -595 -9966 0
 9962  9963  9964 -595  9967 0

c  1+1 --> 2
c    (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0 ∧  p_595) -> (-b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0)
c  in CNF:
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_2
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨  b^{7, 86}_1
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ -p_595 ∨ -b^{7, 86}_0
c  in DIMACS:
 9962  9963 -9964 -595 -9965 0
 9962  9963 -9964 -595  9966 0
 9962  9963 -9964 -595 -9967 0

c  2+1 --> break 
c    (-b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧  p_595) -> break
c  in CNF:
c     b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 9962 -9963  9964 -595 1162 0


c  2-1 --> 1
c    (-b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧ -p_595) -> (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0)
c  in CNF:
c     b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_2
c     b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_1
c     b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨  b^{7, 86}_0
c  in DIMACS:
 9962 -9963  9964  595 -9965 0
 9962 -9963  9964  595 -9966 0
 9962 -9963  9964  595  9967 0

c  1-1 --> 0
c    (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0 ∧ -p_595) -> (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧ -b^{7, 86}_0)
c  in CNF:
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_2
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_1
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_0
c  in DIMACS:
 9962  9963 -9964  595 -9965 0
 9962  9963 -9964  595 -9966 0
 9962  9963 -9964  595 -9967 0

c  0-1 --> -1
c    (-b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧ -p_595) -> ( b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0)
c  in CNF:
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨  b^{7, 86}_2
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_1
c     b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨  b^{7, 86}_0
c  in DIMACS:
 9962  9963  9964  595  9965 0
 9962  9963  9964  595 -9966 0
 9962  9963  9964  595  9967 0

c  -1-1 --> -2
c    ( b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧  b^{7, 85}_0 ∧ -p_595) -> ( b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0)
c  in CNF:
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨  b^{7, 86}_2
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨  b^{7, 86}_1
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨  p_595 ∨ -b^{7, 86}_0
c  in DIMACS:
-9962  9963 -9964  595  9965 0
-9962  9963 -9964  595  9966 0
-9962  9963 -9964  595 -9967 0

c  -2-1 --> break 
c    ( b^{7, 85}_2 ∧  b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨  b^{7, 85}_0 ∨  p_595 ∨ break
c  in DIMACS:
-9962 -9963  9964  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 85}_2 ∧ -b^{7, 85}_1 ∧ -b^{7, 85}_0 ∧ true) 
c  in CNF:
c    -b^{7, 85}_2 ∨  b^{7, 85}_1 ∨  b^{7, 85}_0 ∨ false 
c  in DIMACS:
-9962  9963  9964  0

c  3 does not represent an automaton state.
c    -(-b^{7, 85}_2 ∧  b^{7, 85}_1 ∧  b^{7, 85}_0 ∧ true) 
c  in CNF:
c     b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ false 
c  in DIMACS:
 9962 -9963 -9964  0
c  -3 does not represent an automaton state.
c    -( b^{7, 85}_2 ∧  b^{7, 85}_1 ∧  b^{7, 85}_0 ∧ true) 
c  in CNF:
c    -b^{7, 85}_2 ∨ -b^{7, 85}_1 ∨ -b^{7, 85}_0 ∨ false 
c  in DIMACS:
-9962 -9963 -9964  0

c i = 86
c  -2+1 --> -1
c    ( b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧  p_602) -> ( b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0)
c  in CNF:
c    -b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨  b^{7, 87}_2
c    -b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_1
c    -b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨  b^{7, 87}_0
c  in DIMACS:
-9965 -9966  9967 -602  9968 0
-9965 -9966  9967 -602 -9969 0
-9965 -9966  9967 -602  9970 0

c  -1+1 --> 0
c    ( b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0 ∧  p_602) -> (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧ -b^{7, 87}_0)
c  in CNF:
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_2
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_1
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_0
c  in DIMACS:
-9965  9966 -9967 -602 -9968 0
-9965  9966 -9967 -602 -9969 0
-9965  9966 -9967 -602 -9970 0

c  0+1 --> 1
c    (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧  p_602) -> (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0)
c  in CNF:
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_2
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_1
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨  b^{7, 87}_0
c  in DIMACS:
 9965  9966  9967 -602 -9968 0
 9965  9966  9967 -602 -9969 0
 9965  9966  9967 -602  9970 0

c  1+1 --> 2
c    (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0 ∧  p_602) -> (-b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0)
c  in CNF:
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_2
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨  b^{7, 87}_1
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ -p_602 ∨ -b^{7, 87}_0
c  in DIMACS:
 9965  9966 -9967 -602 -9968 0
 9965  9966 -9967 -602  9969 0
 9965  9966 -9967 -602 -9970 0

c  2+1 --> break 
c    (-b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧  p_602) -> break
c  in CNF:
c     b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 9965 -9966  9967 -602 1162 0


c  2-1 --> 1
c    (-b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧ -p_602) -> (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0)
c  in CNF:
c     b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_2
c     b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_1
c     b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨  b^{7, 87}_0
c  in DIMACS:
 9965 -9966  9967  602 -9968 0
 9965 -9966  9967  602 -9969 0
 9965 -9966  9967  602  9970 0

c  1-1 --> 0
c    (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0 ∧ -p_602) -> (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧ -b^{7, 87}_0)
c  in CNF:
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_2
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_1
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_0
c  in DIMACS:
 9965  9966 -9967  602 -9968 0
 9965  9966 -9967  602 -9969 0
 9965  9966 -9967  602 -9970 0

c  0-1 --> -1
c    (-b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧ -p_602) -> ( b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0)
c  in CNF:
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨  b^{7, 87}_2
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_1
c     b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨  b^{7, 87}_0
c  in DIMACS:
 9965  9966  9967  602  9968 0
 9965  9966  9967  602 -9969 0
 9965  9966  9967  602  9970 0

c  -1-1 --> -2
c    ( b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧  b^{7, 86}_0 ∧ -p_602) -> ( b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0)
c  in CNF:
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨  b^{7, 87}_2
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨  b^{7, 87}_1
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨  p_602 ∨ -b^{7, 87}_0
c  in DIMACS:
-9965  9966 -9967  602  9968 0
-9965  9966 -9967  602  9969 0
-9965  9966 -9967  602 -9970 0

c  -2-1 --> break 
c    ( b^{7, 86}_2 ∧  b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨  b^{7, 86}_0 ∨  p_602 ∨ break
c  in DIMACS:
-9965 -9966  9967  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 86}_2 ∧ -b^{7, 86}_1 ∧ -b^{7, 86}_0 ∧ true) 
c  in CNF:
c    -b^{7, 86}_2 ∨  b^{7, 86}_1 ∨  b^{7, 86}_0 ∨ false 
c  in DIMACS:
-9965  9966  9967  0

c  3 does not represent an automaton state.
c    -(-b^{7, 86}_2 ∧  b^{7, 86}_1 ∧  b^{7, 86}_0 ∧ true) 
c  in CNF:
c     b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ false 
c  in DIMACS:
 9965 -9966 -9967  0
c  -3 does not represent an automaton state.
c    -( b^{7, 86}_2 ∧  b^{7, 86}_1 ∧  b^{7, 86}_0 ∧ true) 
c  in CNF:
c    -b^{7, 86}_2 ∨ -b^{7, 86}_1 ∨ -b^{7, 86}_0 ∨ false 
c  in DIMACS:
-9965 -9966 -9967  0

c i = 87
c  -2+1 --> -1
c    ( b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧  p_609) -> ( b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0)
c  in CNF:
c    -b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨  b^{7, 88}_2
c    -b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_1
c    -b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨  b^{7, 88}_0
c  in DIMACS:
-9968 -9969  9970 -609  9971 0
-9968 -9969  9970 -609 -9972 0
-9968 -9969  9970 -609  9973 0

c  -1+1 --> 0
c    ( b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0 ∧  p_609) -> (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧ -b^{7, 88}_0)
c  in CNF:
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_2
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_1
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_0
c  in DIMACS:
-9968  9969 -9970 -609 -9971 0
-9968  9969 -9970 -609 -9972 0
-9968  9969 -9970 -609 -9973 0

c  0+1 --> 1
c    (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧  p_609) -> (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0)
c  in CNF:
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_2
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_1
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨  b^{7, 88}_0
c  in DIMACS:
 9968  9969  9970 -609 -9971 0
 9968  9969  9970 -609 -9972 0
 9968  9969  9970 -609  9973 0

c  1+1 --> 2
c    (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0 ∧  p_609) -> (-b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0)
c  in CNF:
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_2
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨  b^{7, 88}_1
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ -p_609 ∨ -b^{7, 88}_0
c  in DIMACS:
 9968  9969 -9970 -609 -9971 0
 9968  9969 -9970 -609  9972 0
 9968  9969 -9970 -609 -9973 0

c  2+1 --> break 
c    (-b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧  p_609) -> break
c  in CNF:
c     b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 9968 -9969  9970 -609 1162 0


c  2-1 --> 1
c    (-b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧ -p_609) -> (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0)
c  in CNF:
c     b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_2
c     b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_1
c     b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨  b^{7, 88}_0
c  in DIMACS:
 9968 -9969  9970  609 -9971 0
 9968 -9969  9970  609 -9972 0
 9968 -9969  9970  609  9973 0

c  1-1 --> 0
c    (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0 ∧ -p_609) -> (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧ -b^{7, 88}_0)
c  in CNF:
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_2
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_1
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_0
c  in DIMACS:
 9968  9969 -9970  609 -9971 0
 9968  9969 -9970  609 -9972 0
 9968  9969 -9970  609 -9973 0

c  0-1 --> -1
c    (-b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧ -p_609) -> ( b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0)
c  in CNF:
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨  b^{7, 88}_2
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_1
c     b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨  b^{7, 88}_0
c  in DIMACS:
 9968  9969  9970  609  9971 0
 9968  9969  9970  609 -9972 0
 9968  9969  9970  609  9973 0

c  -1-1 --> -2
c    ( b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧  b^{7, 87}_0 ∧ -p_609) -> ( b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0)
c  in CNF:
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨  b^{7, 88}_2
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨  b^{7, 88}_1
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨  p_609 ∨ -b^{7, 88}_0
c  in DIMACS:
-9968  9969 -9970  609  9971 0
-9968  9969 -9970  609  9972 0
-9968  9969 -9970  609 -9973 0

c  -2-1 --> break 
c    ( b^{7, 87}_2 ∧  b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨  b^{7, 87}_0 ∨  p_609 ∨ break
c  in DIMACS:
-9968 -9969  9970  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 87}_2 ∧ -b^{7, 87}_1 ∧ -b^{7, 87}_0 ∧ true) 
c  in CNF:
c    -b^{7, 87}_2 ∨  b^{7, 87}_1 ∨  b^{7, 87}_0 ∨ false 
c  in DIMACS:
-9968  9969  9970  0

c  3 does not represent an automaton state.
c    -(-b^{7, 87}_2 ∧  b^{7, 87}_1 ∧  b^{7, 87}_0 ∧ true) 
c  in CNF:
c     b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ false 
c  in DIMACS:
 9968 -9969 -9970  0
c  -3 does not represent an automaton state.
c    -( b^{7, 87}_2 ∧  b^{7, 87}_1 ∧  b^{7, 87}_0 ∧ true) 
c  in CNF:
c    -b^{7, 87}_2 ∨ -b^{7, 87}_1 ∨ -b^{7, 87}_0 ∨ false 
c  in DIMACS:
-9968 -9969 -9970  0

c i = 88
c  -2+1 --> -1
c    ( b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧  p_616) -> ( b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0)
c  in CNF:
c    -b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨  b^{7, 89}_2
c    -b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_1
c    -b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨  b^{7, 89}_0
c  in DIMACS:
-9971 -9972  9973 -616  9974 0
-9971 -9972  9973 -616 -9975 0
-9971 -9972  9973 -616  9976 0

c  -1+1 --> 0
c    ( b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0 ∧  p_616) -> (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧ -b^{7, 89}_0)
c  in CNF:
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_2
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_1
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_0
c  in DIMACS:
-9971  9972 -9973 -616 -9974 0
-9971  9972 -9973 -616 -9975 0
-9971  9972 -9973 -616 -9976 0

c  0+1 --> 1
c    (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧  p_616) -> (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0)
c  in CNF:
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_2
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_1
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨  b^{7, 89}_0
c  in DIMACS:
 9971  9972  9973 -616 -9974 0
 9971  9972  9973 -616 -9975 0
 9971  9972  9973 -616  9976 0

c  1+1 --> 2
c    (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0 ∧  p_616) -> (-b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0)
c  in CNF:
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_2
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨  b^{7, 89}_1
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ -p_616 ∨ -b^{7, 89}_0
c  in DIMACS:
 9971  9972 -9973 -616 -9974 0
 9971  9972 -9973 -616  9975 0
 9971  9972 -9973 -616 -9976 0

c  2+1 --> break 
c    (-b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧  p_616) -> break
c  in CNF:
c     b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 9971 -9972  9973 -616 1162 0


c  2-1 --> 1
c    (-b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧ -p_616) -> (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0)
c  in CNF:
c     b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_2
c     b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_1
c     b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨  b^{7, 89}_0
c  in DIMACS:
 9971 -9972  9973  616 -9974 0
 9971 -9972  9973  616 -9975 0
 9971 -9972  9973  616  9976 0

c  1-1 --> 0
c    (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0 ∧ -p_616) -> (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧ -b^{7, 89}_0)
c  in CNF:
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_2
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_1
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_0
c  in DIMACS:
 9971  9972 -9973  616 -9974 0
 9971  9972 -9973  616 -9975 0
 9971  9972 -9973  616 -9976 0

c  0-1 --> -1
c    (-b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧ -p_616) -> ( b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0)
c  in CNF:
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨  b^{7, 89}_2
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_1
c     b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨  b^{7, 89}_0
c  in DIMACS:
 9971  9972  9973  616  9974 0
 9971  9972  9973  616 -9975 0
 9971  9972  9973  616  9976 0

c  -1-1 --> -2
c    ( b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧  b^{7, 88}_0 ∧ -p_616) -> ( b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0)
c  in CNF:
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨  b^{7, 89}_2
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨  b^{7, 89}_1
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨  p_616 ∨ -b^{7, 89}_0
c  in DIMACS:
-9971  9972 -9973  616  9974 0
-9971  9972 -9973  616  9975 0
-9971  9972 -9973  616 -9976 0

c  -2-1 --> break 
c    ( b^{7, 88}_2 ∧  b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨  b^{7, 88}_0 ∨  p_616 ∨ break
c  in DIMACS:
-9971 -9972  9973  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 88}_2 ∧ -b^{7, 88}_1 ∧ -b^{7, 88}_0 ∧ true) 
c  in CNF:
c    -b^{7, 88}_2 ∨  b^{7, 88}_1 ∨  b^{7, 88}_0 ∨ false 
c  in DIMACS:
-9971  9972  9973  0

c  3 does not represent an automaton state.
c    -(-b^{7, 88}_2 ∧  b^{7, 88}_1 ∧  b^{7, 88}_0 ∧ true) 
c  in CNF:
c     b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ false 
c  in DIMACS:
 9971 -9972 -9973  0
c  -3 does not represent an automaton state.
c    -( b^{7, 88}_2 ∧  b^{7, 88}_1 ∧  b^{7, 88}_0 ∧ true) 
c  in CNF:
c    -b^{7, 88}_2 ∨ -b^{7, 88}_1 ∨ -b^{7, 88}_0 ∨ false 
c  in DIMACS:
-9971 -9972 -9973  0

c i = 89
c  -2+1 --> -1
c    ( b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧  p_623) -> ( b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0)
c  in CNF:
c    -b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨  b^{7, 90}_2
c    -b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_1
c    -b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨  b^{7, 90}_0
c  in DIMACS:
-9974 -9975  9976 -623  9977 0
-9974 -9975  9976 -623 -9978 0
-9974 -9975  9976 -623  9979 0

c  -1+1 --> 0
c    ( b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0 ∧  p_623) -> (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧ -b^{7, 90}_0)
c  in CNF:
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_2
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_1
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_0
c  in DIMACS:
-9974  9975 -9976 -623 -9977 0
-9974  9975 -9976 -623 -9978 0
-9974  9975 -9976 -623 -9979 0

c  0+1 --> 1
c    (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧  p_623) -> (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0)
c  in CNF:
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_2
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_1
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨  b^{7, 90}_0
c  in DIMACS:
 9974  9975  9976 -623 -9977 0
 9974  9975  9976 -623 -9978 0
 9974  9975  9976 -623  9979 0

c  1+1 --> 2
c    (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0 ∧  p_623) -> (-b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0)
c  in CNF:
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_2
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨  b^{7, 90}_1
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ -p_623 ∨ -b^{7, 90}_0
c  in DIMACS:
 9974  9975 -9976 -623 -9977 0
 9974  9975 -9976 -623  9978 0
 9974  9975 -9976 -623 -9979 0

c  2+1 --> break 
c    (-b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧  p_623) -> break
c  in CNF:
c     b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ -p_623 ∨ break
c  in DIMACS:
 9974 -9975  9976 -623 1162 0


c  2-1 --> 1
c    (-b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧ -p_623) -> (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0)
c  in CNF:
c     b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_2
c     b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_1
c     b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨  b^{7, 90}_0
c  in DIMACS:
 9974 -9975  9976  623 -9977 0
 9974 -9975  9976  623 -9978 0
 9974 -9975  9976  623  9979 0

c  1-1 --> 0
c    (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0 ∧ -p_623) -> (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧ -b^{7, 90}_0)
c  in CNF:
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_2
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_1
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_0
c  in DIMACS:
 9974  9975 -9976  623 -9977 0
 9974  9975 -9976  623 -9978 0
 9974  9975 -9976  623 -9979 0

c  0-1 --> -1
c    (-b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧ -p_623) -> ( b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0)
c  in CNF:
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨  b^{7, 90}_2
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_1
c     b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨  b^{7, 90}_0
c  in DIMACS:
 9974  9975  9976  623  9977 0
 9974  9975  9976  623 -9978 0
 9974  9975  9976  623  9979 0

c  -1-1 --> -2
c    ( b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧  b^{7, 89}_0 ∧ -p_623) -> ( b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0)
c  in CNF:
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨  b^{7, 90}_2
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨  b^{7, 90}_1
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨  p_623 ∨ -b^{7, 90}_0
c  in DIMACS:
-9974  9975 -9976  623  9977 0
-9974  9975 -9976  623  9978 0
-9974  9975 -9976  623 -9979 0

c  -2-1 --> break 
c    ( b^{7, 89}_2 ∧  b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧ -p_623) -> break
c  in CNF:
c    -b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨  b^{7, 89}_0 ∨  p_623 ∨ break
c  in DIMACS:
-9974 -9975  9976  623 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 89}_2 ∧ -b^{7, 89}_1 ∧ -b^{7, 89}_0 ∧ true) 
c  in CNF:
c    -b^{7, 89}_2 ∨  b^{7, 89}_1 ∨  b^{7, 89}_0 ∨ false 
c  in DIMACS:
-9974  9975  9976  0

c  3 does not represent an automaton state.
c    -(-b^{7, 89}_2 ∧  b^{7, 89}_1 ∧  b^{7, 89}_0 ∧ true) 
c  in CNF:
c     b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ false 
c  in DIMACS:
 9974 -9975 -9976  0
c  -3 does not represent an automaton state.
c    -( b^{7, 89}_2 ∧  b^{7, 89}_1 ∧  b^{7, 89}_0 ∧ true) 
c  in CNF:
c    -b^{7, 89}_2 ∨ -b^{7, 89}_1 ∨ -b^{7, 89}_0 ∨ false 
c  in DIMACS:
-9974 -9975 -9976  0

c i = 90
c  -2+1 --> -1
c    ( b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧  p_630) -> ( b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0)
c  in CNF:
c    -b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨  b^{7, 91}_2
c    -b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_1
c    -b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨  b^{7, 91}_0
c  in DIMACS:
-9977 -9978  9979 -630  9980 0
-9977 -9978  9979 -630 -9981 0
-9977 -9978  9979 -630  9982 0

c  -1+1 --> 0
c    ( b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0 ∧  p_630) -> (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧ -b^{7, 91}_0)
c  in CNF:
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_2
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_1
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_0
c  in DIMACS:
-9977  9978 -9979 -630 -9980 0
-9977  9978 -9979 -630 -9981 0
-9977  9978 -9979 -630 -9982 0

c  0+1 --> 1
c    (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧  p_630) -> (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0)
c  in CNF:
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_2
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_1
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨  b^{7, 91}_0
c  in DIMACS:
 9977  9978  9979 -630 -9980 0
 9977  9978  9979 -630 -9981 0
 9977  9978  9979 -630  9982 0

c  1+1 --> 2
c    (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0 ∧  p_630) -> (-b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0)
c  in CNF:
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_2
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨  b^{7, 91}_1
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ -p_630 ∨ -b^{7, 91}_0
c  in DIMACS:
 9977  9978 -9979 -630 -9980 0
 9977  9978 -9979 -630  9981 0
 9977  9978 -9979 -630 -9982 0

c  2+1 --> break 
c    (-b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧  p_630) -> break
c  in CNF:
c     b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 9977 -9978  9979 -630 1162 0


c  2-1 --> 1
c    (-b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧ -p_630) -> (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0)
c  in CNF:
c     b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_2
c     b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_1
c     b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨  b^{7, 91}_0
c  in DIMACS:
 9977 -9978  9979  630 -9980 0
 9977 -9978  9979  630 -9981 0
 9977 -9978  9979  630  9982 0

c  1-1 --> 0
c    (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0 ∧ -p_630) -> (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧ -b^{7, 91}_0)
c  in CNF:
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_2
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_1
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_0
c  in DIMACS:
 9977  9978 -9979  630 -9980 0
 9977  9978 -9979  630 -9981 0
 9977  9978 -9979  630 -9982 0

c  0-1 --> -1
c    (-b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧ -p_630) -> ( b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0)
c  in CNF:
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨  b^{7, 91}_2
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_1
c     b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨  b^{7, 91}_0
c  in DIMACS:
 9977  9978  9979  630  9980 0
 9977  9978  9979  630 -9981 0
 9977  9978  9979  630  9982 0

c  -1-1 --> -2
c    ( b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧  b^{7, 90}_0 ∧ -p_630) -> ( b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0)
c  in CNF:
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨  b^{7, 91}_2
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨  b^{7, 91}_1
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨  p_630 ∨ -b^{7, 91}_0
c  in DIMACS:
-9977  9978 -9979  630  9980 0
-9977  9978 -9979  630  9981 0
-9977  9978 -9979  630 -9982 0

c  -2-1 --> break 
c    ( b^{7, 90}_2 ∧  b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨  b^{7, 90}_0 ∨  p_630 ∨ break
c  in DIMACS:
-9977 -9978  9979  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 90}_2 ∧ -b^{7, 90}_1 ∧ -b^{7, 90}_0 ∧ true) 
c  in CNF:
c    -b^{7, 90}_2 ∨  b^{7, 90}_1 ∨  b^{7, 90}_0 ∨ false 
c  in DIMACS:
-9977  9978  9979  0

c  3 does not represent an automaton state.
c    -(-b^{7, 90}_2 ∧  b^{7, 90}_1 ∧  b^{7, 90}_0 ∧ true) 
c  in CNF:
c     b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ false 
c  in DIMACS:
 9977 -9978 -9979  0
c  -3 does not represent an automaton state.
c    -( b^{7, 90}_2 ∧  b^{7, 90}_1 ∧  b^{7, 90}_0 ∧ true) 
c  in CNF:
c    -b^{7, 90}_2 ∨ -b^{7, 90}_1 ∨ -b^{7, 90}_0 ∨ false 
c  in DIMACS:
-9977 -9978 -9979  0

c i = 91
c  -2+1 --> -1
c    ( b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧  p_637) -> ( b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0)
c  in CNF:
c    -b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨  b^{7, 92}_2
c    -b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_1
c    -b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨  b^{7, 92}_0
c  in DIMACS:
-9980 -9981  9982 -637  9983 0
-9980 -9981  9982 -637 -9984 0
-9980 -9981  9982 -637  9985 0

c  -1+1 --> 0
c    ( b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0 ∧  p_637) -> (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧ -b^{7, 92}_0)
c  in CNF:
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_2
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_1
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_0
c  in DIMACS:
-9980  9981 -9982 -637 -9983 0
-9980  9981 -9982 -637 -9984 0
-9980  9981 -9982 -637 -9985 0

c  0+1 --> 1
c    (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧  p_637) -> (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0)
c  in CNF:
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_2
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_1
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨  b^{7, 92}_0
c  in DIMACS:
 9980  9981  9982 -637 -9983 0
 9980  9981  9982 -637 -9984 0
 9980  9981  9982 -637  9985 0

c  1+1 --> 2
c    (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0 ∧  p_637) -> (-b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0)
c  in CNF:
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_2
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨  b^{7, 92}_1
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ -p_637 ∨ -b^{7, 92}_0
c  in DIMACS:
 9980  9981 -9982 -637 -9983 0
 9980  9981 -9982 -637  9984 0
 9980  9981 -9982 -637 -9985 0

c  2+1 --> break 
c    (-b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧  p_637) -> break
c  in CNF:
c     b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ -p_637 ∨ break
c  in DIMACS:
 9980 -9981  9982 -637 1162 0


c  2-1 --> 1
c    (-b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧ -p_637) -> (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0)
c  in CNF:
c     b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_2
c     b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_1
c     b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨  b^{7, 92}_0
c  in DIMACS:
 9980 -9981  9982  637 -9983 0
 9980 -9981  9982  637 -9984 0
 9980 -9981  9982  637  9985 0

c  1-1 --> 0
c    (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0 ∧ -p_637) -> (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧ -b^{7, 92}_0)
c  in CNF:
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_2
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_1
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_0
c  in DIMACS:
 9980  9981 -9982  637 -9983 0
 9980  9981 -9982  637 -9984 0
 9980  9981 -9982  637 -9985 0

c  0-1 --> -1
c    (-b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧ -p_637) -> ( b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0)
c  in CNF:
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨  b^{7, 92}_2
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_1
c     b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨  b^{7, 92}_0
c  in DIMACS:
 9980  9981  9982  637  9983 0
 9980  9981  9982  637 -9984 0
 9980  9981  9982  637  9985 0

c  -1-1 --> -2
c    ( b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧  b^{7, 91}_0 ∧ -p_637) -> ( b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0)
c  in CNF:
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨  b^{7, 92}_2
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨  b^{7, 92}_1
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨  p_637 ∨ -b^{7, 92}_0
c  in DIMACS:
-9980  9981 -9982  637  9983 0
-9980  9981 -9982  637  9984 0
-9980  9981 -9982  637 -9985 0

c  -2-1 --> break 
c    ( b^{7, 91}_2 ∧  b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧ -p_637) -> break
c  in CNF:
c    -b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨  b^{7, 91}_0 ∨  p_637 ∨ break
c  in DIMACS:
-9980 -9981  9982  637 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 91}_2 ∧ -b^{7, 91}_1 ∧ -b^{7, 91}_0 ∧ true) 
c  in CNF:
c    -b^{7, 91}_2 ∨  b^{7, 91}_1 ∨  b^{7, 91}_0 ∨ false 
c  in DIMACS:
-9980  9981  9982  0

c  3 does not represent an automaton state.
c    -(-b^{7, 91}_2 ∧  b^{7, 91}_1 ∧  b^{7, 91}_0 ∧ true) 
c  in CNF:
c     b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ false 
c  in DIMACS:
 9980 -9981 -9982  0
c  -3 does not represent an automaton state.
c    -( b^{7, 91}_2 ∧  b^{7, 91}_1 ∧  b^{7, 91}_0 ∧ true) 
c  in CNF:
c    -b^{7, 91}_2 ∨ -b^{7, 91}_1 ∨ -b^{7, 91}_0 ∨ false 
c  in DIMACS:
-9980 -9981 -9982  0

c i = 92
c  -2+1 --> -1
c    ( b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧  p_644) -> ( b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0)
c  in CNF:
c    -b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨  b^{7, 93}_2
c    -b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_1
c    -b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨  b^{7, 93}_0
c  in DIMACS:
-9983 -9984  9985 -644  9986 0
-9983 -9984  9985 -644 -9987 0
-9983 -9984  9985 -644  9988 0

c  -1+1 --> 0
c    ( b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0 ∧  p_644) -> (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧ -b^{7, 93}_0)
c  in CNF:
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_2
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_1
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_0
c  in DIMACS:
-9983  9984 -9985 -644 -9986 0
-9983  9984 -9985 -644 -9987 0
-9983  9984 -9985 -644 -9988 0

c  0+1 --> 1
c    (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧  p_644) -> (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0)
c  in CNF:
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_2
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_1
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨  b^{7, 93}_0
c  in DIMACS:
 9983  9984  9985 -644 -9986 0
 9983  9984  9985 -644 -9987 0
 9983  9984  9985 -644  9988 0

c  1+1 --> 2
c    (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0 ∧  p_644) -> (-b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0)
c  in CNF:
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_2
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨  b^{7, 93}_1
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ -p_644 ∨ -b^{7, 93}_0
c  in DIMACS:
 9983  9984 -9985 -644 -9986 0
 9983  9984 -9985 -644  9987 0
 9983  9984 -9985 -644 -9988 0

c  2+1 --> break 
c    (-b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧  p_644) -> break
c  in CNF:
c     b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 9983 -9984  9985 -644 1162 0


c  2-1 --> 1
c    (-b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧ -p_644) -> (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0)
c  in CNF:
c     b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_2
c     b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_1
c     b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨  b^{7, 93}_0
c  in DIMACS:
 9983 -9984  9985  644 -9986 0
 9983 -9984  9985  644 -9987 0
 9983 -9984  9985  644  9988 0

c  1-1 --> 0
c    (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0 ∧ -p_644) -> (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧ -b^{7, 93}_0)
c  in CNF:
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_2
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_1
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_0
c  in DIMACS:
 9983  9984 -9985  644 -9986 0
 9983  9984 -9985  644 -9987 0
 9983  9984 -9985  644 -9988 0

c  0-1 --> -1
c    (-b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧ -p_644) -> ( b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0)
c  in CNF:
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨  b^{7, 93}_2
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_1
c     b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨  b^{7, 93}_0
c  in DIMACS:
 9983  9984  9985  644  9986 0
 9983  9984  9985  644 -9987 0
 9983  9984  9985  644  9988 0

c  -1-1 --> -2
c    ( b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧  b^{7, 92}_0 ∧ -p_644) -> ( b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0)
c  in CNF:
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨  b^{7, 93}_2
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨  b^{7, 93}_1
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨  p_644 ∨ -b^{7, 93}_0
c  in DIMACS:
-9983  9984 -9985  644  9986 0
-9983  9984 -9985  644  9987 0
-9983  9984 -9985  644 -9988 0

c  -2-1 --> break 
c    ( b^{7, 92}_2 ∧  b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨  b^{7, 92}_0 ∨  p_644 ∨ break
c  in DIMACS:
-9983 -9984  9985  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 92}_2 ∧ -b^{7, 92}_1 ∧ -b^{7, 92}_0 ∧ true) 
c  in CNF:
c    -b^{7, 92}_2 ∨  b^{7, 92}_1 ∨  b^{7, 92}_0 ∨ false 
c  in DIMACS:
-9983  9984  9985  0

c  3 does not represent an automaton state.
c    -(-b^{7, 92}_2 ∧  b^{7, 92}_1 ∧  b^{7, 92}_0 ∧ true) 
c  in CNF:
c     b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ false 
c  in DIMACS:
 9983 -9984 -9985  0
c  -3 does not represent an automaton state.
c    -( b^{7, 92}_2 ∧  b^{7, 92}_1 ∧  b^{7, 92}_0 ∧ true) 
c  in CNF:
c    -b^{7, 92}_2 ∨ -b^{7, 92}_1 ∨ -b^{7, 92}_0 ∨ false 
c  in DIMACS:
-9983 -9984 -9985  0

c i = 93
c  -2+1 --> -1
c    ( b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧  p_651) -> ( b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0)
c  in CNF:
c    -b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨  b^{7, 94}_2
c    -b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_1
c    -b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨  b^{7, 94}_0
c  in DIMACS:
-9986 -9987  9988 -651  9989 0
-9986 -9987  9988 -651 -9990 0
-9986 -9987  9988 -651  9991 0

c  -1+1 --> 0
c    ( b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0 ∧  p_651) -> (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧ -b^{7, 94}_0)
c  in CNF:
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_2
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_1
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_0
c  in DIMACS:
-9986  9987 -9988 -651 -9989 0
-9986  9987 -9988 -651 -9990 0
-9986  9987 -9988 -651 -9991 0

c  0+1 --> 1
c    (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧  p_651) -> (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0)
c  in CNF:
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_2
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_1
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨  b^{7, 94}_0
c  in DIMACS:
 9986  9987  9988 -651 -9989 0
 9986  9987  9988 -651 -9990 0
 9986  9987  9988 -651  9991 0

c  1+1 --> 2
c    (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0 ∧  p_651) -> (-b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0)
c  in CNF:
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_2
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨  b^{7, 94}_1
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ -p_651 ∨ -b^{7, 94}_0
c  in DIMACS:
 9986  9987 -9988 -651 -9989 0
 9986  9987 -9988 -651  9990 0
 9986  9987 -9988 -651 -9991 0

c  2+1 --> break 
c    (-b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧  p_651) -> break
c  in CNF:
c     b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 9986 -9987  9988 -651 1162 0


c  2-1 --> 1
c    (-b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧ -p_651) -> (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0)
c  in CNF:
c     b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_2
c     b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_1
c     b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨  b^{7, 94}_0
c  in DIMACS:
 9986 -9987  9988  651 -9989 0
 9986 -9987  9988  651 -9990 0
 9986 -9987  9988  651  9991 0

c  1-1 --> 0
c    (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0 ∧ -p_651) -> (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧ -b^{7, 94}_0)
c  in CNF:
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_2
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_1
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_0
c  in DIMACS:
 9986  9987 -9988  651 -9989 0
 9986  9987 -9988  651 -9990 0
 9986  9987 -9988  651 -9991 0

c  0-1 --> -1
c    (-b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧ -p_651) -> ( b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0)
c  in CNF:
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨  b^{7, 94}_2
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_1
c     b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨  b^{7, 94}_0
c  in DIMACS:
 9986  9987  9988  651  9989 0
 9986  9987  9988  651 -9990 0
 9986  9987  9988  651  9991 0

c  -1-1 --> -2
c    ( b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧  b^{7, 93}_0 ∧ -p_651) -> ( b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0)
c  in CNF:
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨  b^{7, 94}_2
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨  b^{7, 94}_1
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨  p_651 ∨ -b^{7, 94}_0
c  in DIMACS:
-9986  9987 -9988  651  9989 0
-9986  9987 -9988  651  9990 0
-9986  9987 -9988  651 -9991 0

c  -2-1 --> break 
c    ( b^{7, 93}_2 ∧  b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨  b^{7, 93}_0 ∨  p_651 ∨ break
c  in DIMACS:
-9986 -9987  9988  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 93}_2 ∧ -b^{7, 93}_1 ∧ -b^{7, 93}_0 ∧ true) 
c  in CNF:
c    -b^{7, 93}_2 ∨  b^{7, 93}_1 ∨  b^{7, 93}_0 ∨ false 
c  in DIMACS:
-9986  9987  9988  0

c  3 does not represent an automaton state.
c    -(-b^{7, 93}_2 ∧  b^{7, 93}_1 ∧  b^{7, 93}_0 ∧ true) 
c  in CNF:
c     b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ false 
c  in DIMACS:
 9986 -9987 -9988  0
c  -3 does not represent an automaton state.
c    -( b^{7, 93}_2 ∧  b^{7, 93}_1 ∧  b^{7, 93}_0 ∧ true) 
c  in CNF:
c    -b^{7, 93}_2 ∨ -b^{7, 93}_1 ∨ -b^{7, 93}_0 ∨ false 
c  in DIMACS:
-9986 -9987 -9988  0

c i = 94
c  -2+1 --> -1
c    ( b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧  p_658) -> ( b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0)
c  in CNF:
c    -b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨  b^{7, 95}_2
c    -b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_1
c    -b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨  b^{7, 95}_0
c  in DIMACS:
-9989 -9990  9991 -658  9992 0
-9989 -9990  9991 -658 -9993 0
-9989 -9990  9991 -658  9994 0

c  -1+1 --> 0
c    ( b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0 ∧  p_658) -> (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧ -b^{7, 95}_0)
c  in CNF:
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_2
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_1
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_0
c  in DIMACS:
-9989  9990 -9991 -658 -9992 0
-9989  9990 -9991 -658 -9993 0
-9989  9990 -9991 -658 -9994 0

c  0+1 --> 1
c    (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧  p_658) -> (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0)
c  in CNF:
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_2
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_1
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨  b^{7, 95}_0
c  in DIMACS:
 9989  9990  9991 -658 -9992 0
 9989  9990  9991 -658 -9993 0
 9989  9990  9991 -658  9994 0

c  1+1 --> 2
c    (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0 ∧  p_658) -> (-b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0)
c  in CNF:
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_2
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨  b^{7, 95}_1
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ -p_658 ∨ -b^{7, 95}_0
c  in DIMACS:
 9989  9990 -9991 -658 -9992 0
 9989  9990 -9991 -658  9993 0
 9989  9990 -9991 -658 -9994 0

c  2+1 --> break 
c    (-b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧  p_658) -> break
c  in CNF:
c     b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 9989 -9990  9991 -658 1162 0


c  2-1 --> 1
c    (-b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧ -p_658) -> (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0)
c  in CNF:
c     b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_2
c     b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_1
c     b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨  b^{7, 95}_0
c  in DIMACS:
 9989 -9990  9991  658 -9992 0
 9989 -9990  9991  658 -9993 0
 9989 -9990  9991  658  9994 0

c  1-1 --> 0
c    (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0 ∧ -p_658) -> (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧ -b^{7, 95}_0)
c  in CNF:
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_2
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_1
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_0
c  in DIMACS:
 9989  9990 -9991  658 -9992 0
 9989  9990 -9991  658 -9993 0
 9989  9990 -9991  658 -9994 0

c  0-1 --> -1
c    (-b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧ -p_658) -> ( b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0)
c  in CNF:
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨  b^{7, 95}_2
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_1
c     b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨  b^{7, 95}_0
c  in DIMACS:
 9989  9990  9991  658  9992 0
 9989  9990  9991  658 -9993 0
 9989  9990  9991  658  9994 0

c  -1-1 --> -2
c    ( b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧  b^{7, 94}_0 ∧ -p_658) -> ( b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0)
c  in CNF:
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨  b^{7, 95}_2
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨  b^{7, 95}_1
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨  p_658 ∨ -b^{7, 95}_0
c  in DIMACS:
-9989  9990 -9991  658  9992 0
-9989  9990 -9991  658  9993 0
-9989  9990 -9991  658 -9994 0

c  -2-1 --> break 
c    ( b^{7, 94}_2 ∧  b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨  b^{7, 94}_0 ∨  p_658 ∨ break
c  in DIMACS:
-9989 -9990  9991  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 94}_2 ∧ -b^{7, 94}_1 ∧ -b^{7, 94}_0 ∧ true) 
c  in CNF:
c    -b^{7, 94}_2 ∨  b^{7, 94}_1 ∨  b^{7, 94}_0 ∨ false 
c  in DIMACS:
-9989  9990  9991  0

c  3 does not represent an automaton state.
c    -(-b^{7, 94}_2 ∧  b^{7, 94}_1 ∧  b^{7, 94}_0 ∧ true) 
c  in CNF:
c     b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ false 
c  in DIMACS:
 9989 -9990 -9991  0
c  -3 does not represent an automaton state.
c    -( b^{7, 94}_2 ∧  b^{7, 94}_1 ∧  b^{7, 94}_0 ∧ true) 
c  in CNF:
c    -b^{7, 94}_2 ∨ -b^{7, 94}_1 ∨ -b^{7, 94}_0 ∨ false 
c  in DIMACS:
-9989 -9990 -9991  0

c i = 95
c  -2+1 --> -1
c    ( b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧  p_665) -> ( b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0)
c  in CNF:
c    -b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨  b^{7, 96}_2
c    -b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_1
c    -b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨  b^{7, 96}_0
c  in DIMACS:
-9992 -9993  9994 -665  9995 0
-9992 -9993  9994 -665 -9996 0
-9992 -9993  9994 -665  9997 0

c  -1+1 --> 0
c    ( b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0 ∧  p_665) -> (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧ -b^{7, 96}_0)
c  in CNF:
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_2
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_1
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_0
c  in DIMACS:
-9992  9993 -9994 -665 -9995 0
-9992  9993 -9994 -665 -9996 0
-9992  9993 -9994 -665 -9997 0

c  0+1 --> 1
c    (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧  p_665) -> (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0)
c  in CNF:
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_2
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_1
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨  b^{7, 96}_0
c  in DIMACS:
 9992  9993  9994 -665 -9995 0
 9992  9993  9994 -665 -9996 0
 9992  9993  9994 -665  9997 0

c  1+1 --> 2
c    (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0 ∧  p_665) -> (-b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0)
c  in CNF:
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_2
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨  b^{7, 96}_1
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ -p_665 ∨ -b^{7, 96}_0
c  in DIMACS:
 9992  9993 -9994 -665 -9995 0
 9992  9993 -9994 -665  9996 0
 9992  9993 -9994 -665 -9997 0

c  2+1 --> break 
c    (-b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧  p_665) -> break
c  in CNF:
c     b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 9992 -9993  9994 -665 1162 0


c  2-1 --> 1
c    (-b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧ -p_665) -> (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0)
c  in CNF:
c     b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_2
c     b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_1
c     b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨  b^{7, 96}_0
c  in DIMACS:
 9992 -9993  9994  665 -9995 0
 9992 -9993  9994  665 -9996 0
 9992 -9993  9994  665  9997 0

c  1-1 --> 0
c    (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0 ∧ -p_665) -> (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧ -b^{7, 96}_0)
c  in CNF:
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_2
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_1
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_0
c  in DIMACS:
 9992  9993 -9994  665 -9995 0
 9992  9993 -9994  665 -9996 0
 9992  9993 -9994  665 -9997 0

c  0-1 --> -1
c    (-b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧ -p_665) -> ( b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0)
c  in CNF:
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨  b^{7, 96}_2
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_1
c     b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨  b^{7, 96}_0
c  in DIMACS:
 9992  9993  9994  665  9995 0
 9992  9993  9994  665 -9996 0
 9992  9993  9994  665  9997 0

c  -1-1 --> -2
c    ( b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧  b^{7, 95}_0 ∧ -p_665) -> ( b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0)
c  in CNF:
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨  b^{7, 96}_2
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨  b^{7, 96}_1
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨  p_665 ∨ -b^{7, 96}_0
c  in DIMACS:
-9992  9993 -9994  665  9995 0
-9992  9993 -9994  665  9996 0
-9992  9993 -9994  665 -9997 0

c  -2-1 --> break 
c    ( b^{7, 95}_2 ∧  b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨  b^{7, 95}_0 ∨  p_665 ∨ break
c  in DIMACS:
-9992 -9993  9994  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 95}_2 ∧ -b^{7, 95}_1 ∧ -b^{7, 95}_0 ∧ true) 
c  in CNF:
c    -b^{7, 95}_2 ∨  b^{7, 95}_1 ∨  b^{7, 95}_0 ∨ false 
c  in DIMACS:
-9992  9993  9994  0

c  3 does not represent an automaton state.
c    -(-b^{7, 95}_2 ∧  b^{7, 95}_1 ∧  b^{7, 95}_0 ∧ true) 
c  in CNF:
c     b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ false 
c  in DIMACS:
 9992 -9993 -9994  0
c  -3 does not represent an automaton state.
c    -( b^{7, 95}_2 ∧  b^{7, 95}_1 ∧  b^{7, 95}_0 ∧ true) 
c  in CNF:
c    -b^{7, 95}_2 ∨ -b^{7, 95}_1 ∨ -b^{7, 95}_0 ∨ false 
c  in DIMACS:
-9992 -9993 -9994  0

c i = 96
c  -2+1 --> -1
c    ( b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧  p_672) -> ( b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0)
c  in CNF:
c    -b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨  b^{7, 97}_2
c    -b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_1
c    -b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨  b^{7, 97}_0
c  in DIMACS:
-9995 -9996  9997 -672  9998 0
-9995 -9996  9997 -672 -9999 0
-9995 -9996  9997 -672  10000 0

c  -1+1 --> 0
c    ( b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0 ∧  p_672) -> (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧ -b^{7, 97}_0)
c  in CNF:
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_2
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_1
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_0
c  in DIMACS:
-9995  9996 -9997 -672 -9998 0
-9995  9996 -9997 -672 -9999 0
-9995  9996 -9997 -672 -10000 0

c  0+1 --> 1
c    (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧  p_672) -> (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0)
c  in CNF:
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_2
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_1
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨  b^{7, 97}_0
c  in DIMACS:
 9995  9996  9997 -672 -9998 0
 9995  9996  9997 -672 -9999 0
 9995  9996  9997 -672  10000 0

c  1+1 --> 2
c    (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0 ∧  p_672) -> (-b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0)
c  in CNF:
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_2
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨  b^{7, 97}_1
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ -p_672 ∨ -b^{7, 97}_0
c  in DIMACS:
 9995  9996 -9997 -672 -9998 0
 9995  9996 -9997 -672  9999 0
 9995  9996 -9997 -672 -10000 0

c  2+1 --> break 
c    (-b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧  p_672) -> break
c  in CNF:
c     b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 9995 -9996  9997 -672 1162 0


c  2-1 --> 1
c    (-b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧ -p_672) -> (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0)
c  in CNF:
c     b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_2
c     b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_1
c     b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨  b^{7, 97}_0
c  in DIMACS:
 9995 -9996  9997  672 -9998 0
 9995 -9996  9997  672 -9999 0
 9995 -9996  9997  672  10000 0

c  1-1 --> 0
c    (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0 ∧ -p_672) -> (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧ -b^{7, 97}_0)
c  in CNF:
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_2
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_1
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_0
c  in DIMACS:
 9995  9996 -9997  672 -9998 0
 9995  9996 -9997  672 -9999 0
 9995  9996 -9997  672 -10000 0

c  0-1 --> -1
c    (-b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧ -p_672) -> ( b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0)
c  in CNF:
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨  b^{7, 97}_2
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_1
c     b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨  b^{7, 97}_0
c  in DIMACS:
 9995  9996  9997  672  9998 0
 9995  9996  9997  672 -9999 0
 9995  9996  9997  672  10000 0

c  -1-1 --> -2
c    ( b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧  b^{7, 96}_0 ∧ -p_672) -> ( b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0)
c  in CNF:
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨  b^{7, 97}_2
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨  b^{7, 97}_1
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨  p_672 ∨ -b^{7, 97}_0
c  in DIMACS:
-9995  9996 -9997  672  9998 0
-9995  9996 -9997  672  9999 0
-9995  9996 -9997  672 -10000 0

c  -2-1 --> break 
c    ( b^{7, 96}_2 ∧  b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨  b^{7, 96}_0 ∨  p_672 ∨ break
c  in DIMACS:
-9995 -9996  9997  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 96}_2 ∧ -b^{7, 96}_1 ∧ -b^{7, 96}_0 ∧ true) 
c  in CNF:
c    -b^{7, 96}_2 ∨  b^{7, 96}_1 ∨  b^{7, 96}_0 ∨ false 
c  in DIMACS:
-9995  9996  9997  0

c  3 does not represent an automaton state.
c    -(-b^{7, 96}_2 ∧  b^{7, 96}_1 ∧  b^{7, 96}_0 ∧ true) 
c  in CNF:
c     b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ false 
c  in DIMACS:
 9995 -9996 -9997  0
c  -3 does not represent an automaton state.
c    -( b^{7, 96}_2 ∧  b^{7, 96}_1 ∧  b^{7, 96}_0 ∧ true) 
c  in CNF:
c    -b^{7, 96}_2 ∨ -b^{7, 96}_1 ∨ -b^{7, 96}_0 ∨ false 
c  in DIMACS:
-9995 -9996 -9997  0

c i = 97
c  -2+1 --> -1
c    ( b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧  p_679) -> ( b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0)
c  in CNF:
c    -b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨  b^{7, 98}_2
c    -b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_1
c    -b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨  b^{7, 98}_0
c  in DIMACS:
-9998 -9999  10000 -679  10001 0
-9998 -9999  10000 -679 -10002 0
-9998 -9999  10000 -679  10003 0

c  -1+1 --> 0
c    ( b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0 ∧  p_679) -> (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧ -b^{7, 98}_0)
c  in CNF:
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_2
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_1
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_0
c  in DIMACS:
-9998  9999 -10000 -679 -10001 0
-9998  9999 -10000 -679 -10002 0
-9998  9999 -10000 -679 -10003 0

c  0+1 --> 1
c    (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧  p_679) -> (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0)
c  in CNF:
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_2
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_1
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨  b^{7, 98}_0
c  in DIMACS:
 9998  9999  10000 -679 -10001 0
 9998  9999  10000 -679 -10002 0
 9998  9999  10000 -679  10003 0

c  1+1 --> 2
c    (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0 ∧  p_679) -> (-b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0)
c  in CNF:
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_2
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨  b^{7, 98}_1
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ -p_679 ∨ -b^{7, 98}_0
c  in DIMACS:
 9998  9999 -10000 -679 -10001 0
 9998  9999 -10000 -679  10002 0
 9998  9999 -10000 -679 -10003 0

c  2+1 --> break 
c    (-b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧  p_679) -> break
c  in CNF:
c     b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ -p_679 ∨ break
c  in DIMACS:
 9998 -9999  10000 -679 1162 0


c  2-1 --> 1
c    (-b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧ -p_679) -> (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0)
c  in CNF:
c     b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_2
c     b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_1
c     b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨  b^{7, 98}_0
c  in DIMACS:
 9998 -9999  10000  679 -10001 0
 9998 -9999  10000  679 -10002 0
 9998 -9999  10000  679  10003 0

c  1-1 --> 0
c    (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0 ∧ -p_679) -> (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧ -b^{7, 98}_0)
c  in CNF:
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_2
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_1
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_0
c  in DIMACS:
 9998  9999 -10000  679 -10001 0
 9998  9999 -10000  679 -10002 0
 9998  9999 -10000  679 -10003 0

c  0-1 --> -1
c    (-b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧ -p_679) -> ( b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0)
c  in CNF:
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨  b^{7, 98}_2
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_1
c     b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨  b^{7, 98}_0
c  in DIMACS:
 9998  9999  10000  679  10001 0
 9998  9999  10000  679 -10002 0
 9998  9999  10000  679  10003 0

c  -1-1 --> -2
c    ( b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧  b^{7, 97}_0 ∧ -p_679) -> ( b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0)
c  in CNF:
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨  b^{7, 98}_2
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨  b^{7, 98}_1
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨  p_679 ∨ -b^{7, 98}_0
c  in DIMACS:
-9998  9999 -10000  679  10001 0
-9998  9999 -10000  679  10002 0
-9998  9999 -10000  679 -10003 0

c  -2-1 --> break 
c    ( b^{7, 97}_2 ∧  b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧ -p_679) -> break
c  in CNF:
c    -b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨  b^{7, 97}_0 ∨  p_679 ∨ break
c  in DIMACS:
-9998 -9999  10000  679 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 97}_2 ∧ -b^{7, 97}_1 ∧ -b^{7, 97}_0 ∧ true) 
c  in CNF:
c    -b^{7, 97}_2 ∨  b^{7, 97}_1 ∨  b^{7, 97}_0 ∨ false 
c  in DIMACS:
-9998  9999  10000  0

c  3 does not represent an automaton state.
c    -(-b^{7, 97}_2 ∧  b^{7, 97}_1 ∧  b^{7, 97}_0 ∧ true) 
c  in CNF:
c     b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ false 
c  in DIMACS:
 9998 -9999 -10000  0
c  -3 does not represent an automaton state.
c    -( b^{7, 97}_2 ∧  b^{7, 97}_1 ∧  b^{7, 97}_0 ∧ true) 
c  in CNF:
c    -b^{7, 97}_2 ∨ -b^{7, 97}_1 ∨ -b^{7, 97}_0 ∨ false 
c  in DIMACS:
-9998 -9999 -10000  0

c i = 98
c  -2+1 --> -1
c    ( b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧  p_686) -> ( b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0)
c  in CNF:
c    -b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨  b^{7, 99}_2
c    -b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_1
c    -b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨  b^{7, 99}_0
c  in DIMACS:
-10001 -10002  10003 -686  10004 0
-10001 -10002  10003 -686 -10005 0
-10001 -10002  10003 -686  10006 0

c  -1+1 --> 0
c    ( b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0 ∧  p_686) -> (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧ -b^{7, 99}_0)
c  in CNF:
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_2
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_1
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_0
c  in DIMACS:
-10001  10002 -10003 -686 -10004 0
-10001  10002 -10003 -686 -10005 0
-10001  10002 -10003 -686 -10006 0

c  0+1 --> 1
c    (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧  p_686) -> (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0)
c  in CNF:
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_2
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_1
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨  b^{7, 99}_0
c  in DIMACS:
 10001  10002  10003 -686 -10004 0
 10001  10002  10003 -686 -10005 0
 10001  10002  10003 -686  10006 0

c  1+1 --> 2
c    (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0 ∧  p_686) -> (-b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0)
c  in CNF:
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_2
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨  b^{7, 99}_1
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ -p_686 ∨ -b^{7, 99}_0
c  in DIMACS:
 10001  10002 -10003 -686 -10004 0
 10001  10002 -10003 -686  10005 0
 10001  10002 -10003 -686 -10006 0

c  2+1 --> break 
c    (-b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧  p_686) -> break
c  in CNF:
c     b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 10001 -10002  10003 -686 1162 0


c  2-1 --> 1
c    (-b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧ -p_686) -> (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0)
c  in CNF:
c     b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_2
c     b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_1
c     b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨  b^{7, 99}_0
c  in DIMACS:
 10001 -10002  10003  686 -10004 0
 10001 -10002  10003  686 -10005 0
 10001 -10002  10003  686  10006 0

c  1-1 --> 0
c    (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0 ∧ -p_686) -> (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧ -b^{7, 99}_0)
c  in CNF:
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_2
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_1
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_0
c  in DIMACS:
 10001  10002 -10003  686 -10004 0
 10001  10002 -10003  686 -10005 0
 10001  10002 -10003  686 -10006 0

c  0-1 --> -1
c    (-b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧ -p_686) -> ( b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0)
c  in CNF:
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨  b^{7, 99}_2
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_1
c     b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨  b^{7, 99}_0
c  in DIMACS:
 10001  10002  10003  686  10004 0
 10001  10002  10003  686 -10005 0
 10001  10002  10003  686  10006 0

c  -1-1 --> -2
c    ( b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧  b^{7, 98}_0 ∧ -p_686) -> ( b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0)
c  in CNF:
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨  b^{7, 99}_2
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨  b^{7, 99}_1
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨  p_686 ∨ -b^{7, 99}_0
c  in DIMACS:
-10001  10002 -10003  686  10004 0
-10001  10002 -10003  686  10005 0
-10001  10002 -10003  686 -10006 0

c  -2-1 --> break 
c    ( b^{7, 98}_2 ∧  b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨  b^{7, 98}_0 ∨  p_686 ∨ break
c  in DIMACS:
-10001 -10002  10003  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 98}_2 ∧ -b^{7, 98}_1 ∧ -b^{7, 98}_0 ∧ true) 
c  in CNF:
c    -b^{7, 98}_2 ∨  b^{7, 98}_1 ∨  b^{7, 98}_0 ∨ false 
c  in DIMACS:
-10001  10002  10003  0

c  3 does not represent an automaton state.
c    -(-b^{7, 98}_2 ∧  b^{7, 98}_1 ∧  b^{7, 98}_0 ∧ true) 
c  in CNF:
c     b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ false 
c  in DIMACS:
 10001 -10002 -10003  0
c  -3 does not represent an automaton state.
c    -( b^{7, 98}_2 ∧  b^{7, 98}_1 ∧  b^{7, 98}_0 ∧ true) 
c  in CNF:
c    -b^{7, 98}_2 ∨ -b^{7, 98}_1 ∨ -b^{7, 98}_0 ∨ false 
c  in DIMACS:
-10001 -10002 -10003  0

c i = 99
c  -2+1 --> -1
c    ( b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧  p_693) -> ( b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0)
c  in CNF:
c    -b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨  b^{7, 100}_2
c    -b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_1
c    -b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨  b^{7, 100}_0
c  in DIMACS:
-10004 -10005  10006 -693  10007 0
-10004 -10005  10006 -693 -10008 0
-10004 -10005  10006 -693  10009 0

c  -1+1 --> 0
c    ( b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0 ∧  p_693) -> (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧ -b^{7, 100}_0)
c  in CNF:
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_2
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_1
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_0
c  in DIMACS:
-10004  10005 -10006 -693 -10007 0
-10004  10005 -10006 -693 -10008 0
-10004  10005 -10006 -693 -10009 0

c  0+1 --> 1
c    (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧  p_693) -> (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0)
c  in CNF:
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_2
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_1
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨  b^{7, 100}_0
c  in DIMACS:
 10004  10005  10006 -693 -10007 0
 10004  10005  10006 -693 -10008 0
 10004  10005  10006 -693  10009 0

c  1+1 --> 2
c    (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0 ∧  p_693) -> (-b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0)
c  in CNF:
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_2
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨  b^{7, 100}_1
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ -p_693 ∨ -b^{7, 100}_0
c  in DIMACS:
 10004  10005 -10006 -693 -10007 0
 10004  10005 -10006 -693  10008 0
 10004  10005 -10006 -693 -10009 0

c  2+1 --> break 
c    (-b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧  p_693) -> break
c  in CNF:
c     b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 10004 -10005  10006 -693 1162 0


c  2-1 --> 1
c    (-b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧ -p_693) -> (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0)
c  in CNF:
c     b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_2
c     b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_1
c     b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨  b^{7, 100}_0
c  in DIMACS:
 10004 -10005  10006  693 -10007 0
 10004 -10005  10006  693 -10008 0
 10004 -10005  10006  693  10009 0

c  1-1 --> 0
c    (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0 ∧ -p_693) -> (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧ -b^{7, 100}_0)
c  in CNF:
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_2
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_1
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_0
c  in DIMACS:
 10004  10005 -10006  693 -10007 0
 10004  10005 -10006  693 -10008 0
 10004  10005 -10006  693 -10009 0

c  0-1 --> -1
c    (-b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧ -p_693) -> ( b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0)
c  in CNF:
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨  b^{7, 100}_2
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_1
c     b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨  b^{7, 100}_0
c  in DIMACS:
 10004  10005  10006  693  10007 0
 10004  10005  10006  693 -10008 0
 10004  10005  10006  693  10009 0

c  -1-1 --> -2
c    ( b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧  b^{7, 99}_0 ∧ -p_693) -> ( b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0)
c  in CNF:
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨  b^{7, 100}_2
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨  b^{7, 100}_1
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨  p_693 ∨ -b^{7, 100}_0
c  in DIMACS:
-10004  10005 -10006  693  10007 0
-10004  10005 -10006  693  10008 0
-10004  10005 -10006  693 -10009 0

c  -2-1 --> break 
c    ( b^{7, 99}_2 ∧  b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨  b^{7, 99}_0 ∨  p_693 ∨ break
c  in DIMACS:
-10004 -10005  10006  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 99}_2 ∧ -b^{7, 99}_1 ∧ -b^{7, 99}_0 ∧ true) 
c  in CNF:
c    -b^{7, 99}_2 ∨  b^{7, 99}_1 ∨  b^{7, 99}_0 ∨ false 
c  in DIMACS:
-10004  10005  10006  0

c  3 does not represent an automaton state.
c    -(-b^{7, 99}_2 ∧  b^{7, 99}_1 ∧  b^{7, 99}_0 ∧ true) 
c  in CNF:
c     b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ false 
c  in DIMACS:
 10004 -10005 -10006  0
c  -3 does not represent an automaton state.
c    -( b^{7, 99}_2 ∧  b^{7, 99}_1 ∧  b^{7, 99}_0 ∧ true) 
c  in CNF:
c    -b^{7, 99}_2 ∨ -b^{7, 99}_1 ∨ -b^{7, 99}_0 ∨ false 
c  in DIMACS:
-10004 -10005 -10006  0

c i = 100
c  -2+1 --> -1
c    ( b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧  p_700) -> ( b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0)
c  in CNF:
c    -b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨  b^{7, 101}_2
c    -b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_1
c    -b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨  b^{7, 101}_0
c  in DIMACS:
-10007 -10008  10009 -700  10010 0
-10007 -10008  10009 -700 -10011 0
-10007 -10008  10009 -700  10012 0

c  -1+1 --> 0
c    ( b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0 ∧  p_700) -> (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧ -b^{7, 101}_0)
c  in CNF:
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_2
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_1
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_0
c  in DIMACS:
-10007  10008 -10009 -700 -10010 0
-10007  10008 -10009 -700 -10011 0
-10007  10008 -10009 -700 -10012 0

c  0+1 --> 1
c    (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧  p_700) -> (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0)
c  in CNF:
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_2
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_1
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨  b^{7, 101}_0
c  in DIMACS:
 10007  10008  10009 -700 -10010 0
 10007  10008  10009 -700 -10011 0
 10007  10008  10009 -700  10012 0

c  1+1 --> 2
c    (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0 ∧  p_700) -> (-b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0)
c  in CNF:
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_2
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨  b^{7, 101}_1
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ -p_700 ∨ -b^{7, 101}_0
c  in DIMACS:
 10007  10008 -10009 -700 -10010 0
 10007  10008 -10009 -700  10011 0
 10007  10008 -10009 -700 -10012 0

c  2+1 --> break 
c    (-b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧  p_700) -> break
c  in CNF:
c     b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 10007 -10008  10009 -700 1162 0


c  2-1 --> 1
c    (-b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧ -p_700) -> (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0)
c  in CNF:
c     b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_2
c     b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_1
c     b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨  b^{7, 101}_0
c  in DIMACS:
 10007 -10008  10009  700 -10010 0
 10007 -10008  10009  700 -10011 0
 10007 -10008  10009  700  10012 0

c  1-1 --> 0
c    (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0 ∧ -p_700) -> (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧ -b^{7, 101}_0)
c  in CNF:
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_2
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_1
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_0
c  in DIMACS:
 10007  10008 -10009  700 -10010 0
 10007  10008 -10009  700 -10011 0
 10007  10008 -10009  700 -10012 0

c  0-1 --> -1
c    (-b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧ -p_700) -> ( b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0)
c  in CNF:
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨  b^{7, 101}_2
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_1
c     b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨  b^{7, 101}_0
c  in DIMACS:
 10007  10008  10009  700  10010 0
 10007  10008  10009  700 -10011 0
 10007  10008  10009  700  10012 0

c  -1-1 --> -2
c    ( b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧  b^{7, 100}_0 ∧ -p_700) -> ( b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0)
c  in CNF:
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨  b^{7, 101}_2
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨  b^{7, 101}_1
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨  p_700 ∨ -b^{7, 101}_0
c  in DIMACS:
-10007  10008 -10009  700  10010 0
-10007  10008 -10009  700  10011 0
-10007  10008 -10009  700 -10012 0

c  -2-1 --> break 
c    ( b^{7, 100}_2 ∧  b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨  b^{7, 100}_0 ∨  p_700 ∨ break
c  in DIMACS:
-10007 -10008  10009  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 100}_2 ∧ -b^{7, 100}_1 ∧ -b^{7, 100}_0 ∧ true) 
c  in CNF:
c    -b^{7, 100}_2 ∨  b^{7, 100}_1 ∨  b^{7, 100}_0 ∨ false 
c  in DIMACS:
-10007  10008  10009  0

c  3 does not represent an automaton state.
c    -(-b^{7, 100}_2 ∧  b^{7, 100}_1 ∧  b^{7, 100}_0 ∧ true) 
c  in CNF:
c     b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ false 
c  in DIMACS:
 10007 -10008 -10009  0
c  -3 does not represent an automaton state.
c    -( b^{7, 100}_2 ∧  b^{7, 100}_1 ∧  b^{7, 100}_0 ∧ true) 
c  in CNF:
c    -b^{7, 100}_2 ∨ -b^{7, 100}_1 ∨ -b^{7, 100}_0 ∨ false 
c  in DIMACS:
-10007 -10008 -10009  0

c i = 101
c  -2+1 --> -1
c    ( b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧  p_707) -> ( b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0)
c  in CNF:
c    -b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨  b^{7, 102}_2
c    -b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_1
c    -b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨  b^{7, 102}_0
c  in DIMACS:
-10010 -10011  10012 -707  10013 0
-10010 -10011  10012 -707 -10014 0
-10010 -10011  10012 -707  10015 0

c  -1+1 --> 0
c    ( b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0 ∧  p_707) -> (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧ -b^{7, 102}_0)
c  in CNF:
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_2
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_1
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_0
c  in DIMACS:
-10010  10011 -10012 -707 -10013 0
-10010  10011 -10012 -707 -10014 0
-10010  10011 -10012 -707 -10015 0

c  0+1 --> 1
c    (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧  p_707) -> (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0)
c  in CNF:
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_2
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_1
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨  b^{7, 102}_0
c  in DIMACS:
 10010  10011  10012 -707 -10013 0
 10010  10011  10012 -707 -10014 0
 10010  10011  10012 -707  10015 0

c  1+1 --> 2
c    (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0 ∧  p_707) -> (-b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0)
c  in CNF:
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_2
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨  b^{7, 102}_1
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ -p_707 ∨ -b^{7, 102}_0
c  in DIMACS:
 10010  10011 -10012 -707 -10013 0
 10010  10011 -10012 -707  10014 0
 10010  10011 -10012 -707 -10015 0

c  2+1 --> break 
c    (-b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧  p_707) -> break
c  in CNF:
c     b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ -p_707 ∨ break
c  in DIMACS:
 10010 -10011  10012 -707 1162 0


c  2-1 --> 1
c    (-b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧ -p_707) -> (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0)
c  in CNF:
c     b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_2
c     b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_1
c     b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨  b^{7, 102}_0
c  in DIMACS:
 10010 -10011  10012  707 -10013 0
 10010 -10011  10012  707 -10014 0
 10010 -10011  10012  707  10015 0

c  1-1 --> 0
c    (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0 ∧ -p_707) -> (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧ -b^{7, 102}_0)
c  in CNF:
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_2
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_1
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_0
c  in DIMACS:
 10010  10011 -10012  707 -10013 0
 10010  10011 -10012  707 -10014 0
 10010  10011 -10012  707 -10015 0

c  0-1 --> -1
c    (-b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧ -p_707) -> ( b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0)
c  in CNF:
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨  b^{7, 102}_2
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_1
c     b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨  b^{7, 102}_0
c  in DIMACS:
 10010  10011  10012  707  10013 0
 10010  10011  10012  707 -10014 0
 10010  10011  10012  707  10015 0

c  -1-1 --> -2
c    ( b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧  b^{7, 101}_0 ∧ -p_707) -> ( b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0)
c  in CNF:
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨  b^{7, 102}_2
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨  b^{7, 102}_1
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨  p_707 ∨ -b^{7, 102}_0
c  in DIMACS:
-10010  10011 -10012  707  10013 0
-10010  10011 -10012  707  10014 0
-10010  10011 -10012  707 -10015 0

c  -2-1 --> break 
c    ( b^{7, 101}_2 ∧  b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧ -p_707) -> break
c  in CNF:
c    -b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨  b^{7, 101}_0 ∨  p_707 ∨ break
c  in DIMACS:
-10010 -10011  10012  707 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 101}_2 ∧ -b^{7, 101}_1 ∧ -b^{7, 101}_0 ∧ true) 
c  in CNF:
c    -b^{7, 101}_2 ∨  b^{7, 101}_1 ∨  b^{7, 101}_0 ∨ false 
c  in DIMACS:
-10010  10011  10012  0

c  3 does not represent an automaton state.
c    -(-b^{7, 101}_2 ∧  b^{7, 101}_1 ∧  b^{7, 101}_0 ∧ true) 
c  in CNF:
c     b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ false 
c  in DIMACS:
 10010 -10011 -10012  0
c  -3 does not represent an automaton state.
c    -( b^{7, 101}_2 ∧  b^{7, 101}_1 ∧  b^{7, 101}_0 ∧ true) 
c  in CNF:
c    -b^{7, 101}_2 ∨ -b^{7, 101}_1 ∨ -b^{7, 101}_0 ∨ false 
c  in DIMACS:
-10010 -10011 -10012  0

c i = 102
c  -2+1 --> -1
c    ( b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧  p_714) -> ( b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0)
c  in CNF:
c    -b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨  b^{7, 103}_2
c    -b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_1
c    -b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨  b^{7, 103}_0
c  in DIMACS:
-10013 -10014  10015 -714  10016 0
-10013 -10014  10015 -714 -10017 0
-10013 -10014  10015 -714  10018 0

c  -1+1 --> 0
c    ( b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0 ∧  p_714) -> (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧ -b^{7, 103}_0)
c  in CNF:
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_2
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_1
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_0
c  in DIMACS:
-10013  10014 -10015 -714 -10016 0
-10013  10014 -10015 -714 -10017 0
-10013  10014 -10015 -714 -10018 0

c  0+1 --> 1
c    (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧  p_714) -> (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0)
c  in CNF:
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_2
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_1
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨  b^{7, 103}_0
c  in DIMACS:
 10013  10014  10015 -714 -10016 0
 10013  10014  10015 -714 -10017 0
 10013  10014  10015 -714  10018 0

c  1+1 --> 2
c    (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0 ∧  p_714) -> (-b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0)
c  in CNF:
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_2
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨  b^{7, 103}_1
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ -p_714 ∨ -b^{7, 103}_0
c  in DIMACS:
 10013  10014 -10015 -714 -10016 0
 10013  10014 -10015 -714  10017 0
 10013  10014 -10015 -714 -10018 0

c  2+1 --> break 
c    (-b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧  p_714) -> break
c  in CNF:
c     b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 10013 -10014  10015 -714 1162 0


c  2-1 --> 1
c    (-b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧ -p_714) -> (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0)
c  in CNF:
c     b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_2
c     b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_1
c     b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨  b^{7, 103}_0
c  in DIMACS:
 10013 -10014  10015  714 -10016 0
 10013 -10014  10015  714 -10017 0
 10013 -10014  10015  714  10018 0

c  1-1 --> 0
c    (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0 ∧ -p_714) -> (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧ -b^{7, 103}_0)
c  in CNF:
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_2
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_1
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_0
c  in DIMACS:
 10013  10014 -10015  714 -10016 0
 10013  10014 -10015  714 -10017 0
 10013  10014 -10015  714 -10018 0

c  0-1 --> -1
c    (-b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧ -p_714) -> ( b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0)
c  in CNF:
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨  b^{7, 103}_2
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_1
c     b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨  b^{7, 103}_0
c  in DIMACS:
 10013  10014  10015  714  10016 0
 10013  10014  10015  714 -10017 0
 10013  10014  10015  714  10018 0

c  -1-1 --> -2
c    ( b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧  b^{7, 102}_0 ∧ -p_714) -> ( b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0)
c  in CNF:
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨  b^{7, 103}_2
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨  b^{7, 103}_1
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨  p_714 ∨ -b^{7, 103}_0
c  in DIMACS:
-10013  10014 -10015  714  10016 0
-10013  10014 -10015  714  10017 0
-10013  10014 -10015  714 -10018 0

c  -2-1 --> break 
c    ( b^{7, 102}_2 ∧  b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨  b^{7, 102}_0 ∨  p_714 ∨ break
c  in DIMACS:
-10013 -10014  10015  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 102}_2 ∧ -b^{7, 102}_1 ∧ -b^{7, 102}_0 ∧ true) 
c  in CNF:
c    -b^{7, 102}_2 ∨  b^{7, 102}_1 ∨  b^{7, 102}_0 ∨ false 
c  in DIMACS:
-10013  10014  10015  0

c  3 does not represent an automaton state.
c    -(-b^{7, 102}_2 ∧  b^{7, 102}_1 ∧  b^{7, 102}_0 ∧ true) 
c  in CNF:
c     b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ false 
c  in DIMACS:
 10013 -10014 -10015  0
c  -3 does not represent an automaton state.
c    -( b^{7, 102}_2 ∧  b^{7, 102}_1 ∧  b^{7, 102}_0 ∧ true) 
c  in CNF:
c    -b^{7, 102}_2 ∨ -b^{7, 102}_1 ∨ -b^{7, 102}_0 ∨ false 
c  in DIMACS:
-10013 -10014 -10015  0

c i = 103
c  -2+1 --> -1
c    ( b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧  p_721) -> ( b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0)
c  in CNF:
c    -b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨  b^{7, 104}_2
c    -b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_1
c    -b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨  b^{7, 104}_0
c  in DIMACS:
-10016 -10017  10018 -721  10019 0
-10016 -10017  10018 -721 -10020 0
-10016 -10017  10018 -721  10021 0

c  -1+1 --> 0
c    ( b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0 ∧  p_721) -> (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧ -b^{7, 104}_0)
c  in CNF:
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_2
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_1
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_0
c  in DIMACS:
-10016  10017 -10018 -721 -10019 0
-10016  10017 -10018 -721 -10020 0
-10016  10017 -10018 -721 -10021 0

c  0+1 --> 1
c    (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧  p_721) -> (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0)
c  in CNF:
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_2
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_1
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨  b^{7, 104}_0
c  in DIMACS:
 10016  10017  10018 -721 -10019 0
 10016  10017  10018 -721 -10020 0
 10016  10017  10018 -721  10021 0

c  1+1 --> 2
c    (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0 ∧  p_721) -> (-b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0)
c  in CNF:
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_2
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨  b^{7, 104}_1
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ -p_721 ∨ -b^{7, 104}_0
c  in DIMACS:
 10016  10017 -10018 -721 -10019 0
 10016  10017 -10018 -721  10020 0
 10016  10017 -10018 -721 -10021 0

c  2+1 --> break 
c    (-b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧  p_721) -> break
c  in CNF:
c     b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ -p_721 ∨ break
c  in DIMACS:
 10016 -10017  10018 -721 1162 0


c  2-1 --> 1
c    (-b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧ -p_721) -> (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0)
c  in CNF:
c     b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_2
c     b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_1
c     b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨  b^{7, 104}_0
c  in DIMACS:
 10016 -10017  10018  721 -10019 0
 10016 -10017  10018  721 -10020 0
 10016 -10017  10018  721  10021 0

c  1-1 --> 0
c    (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0 ∧ -p_721) -> (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧ -b^{7, 104}_0)
c  in CNF:
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_2
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_1
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_0
c  in DIMACS:
 10016  10017 -10018  721 -10019 0
 10016  10017 -10018  721 -10020 0
 10016  10017 -10018  721 -10021 0

c  0-1 --> -1
c    (-b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧ -p_721) -> ( b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0)
c  in CNF:
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨  b^{7, 104}_2
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_1
c     b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨  b^{7, 104}_0
c  in DIMACS:
 10016  10017  10018  721  10019 0
 10016  10017  10018  721 -10020 0
 10016  10017  10018  721  10021 0

c  -1-1 --> -2
c    ( b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧  b^{7, 103}_0 ∧ -p_721) -> ( b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0)
c  in CNF:
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨  b^{7, 104}_2
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨  b^{7, 104}_1
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨  p_721 ∨ -b^{7, 104}_0
c  in DIMACS:
-10016  10017 -10018  721  10019 0
-10016  10017 -10018  721  10020 0
-10016  10017 -10018  721 -10021 0

c  -2-1 --> break 
c    ( b^{7, 103}_2 ∧  b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧ -p_721) -> break
c  in CNF:
c    -b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨  b^{7, 103}_0 ∨  p_721 ∨ break
c  in DIMACS:
-10016 -10017  10018  721 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 103}_2 ∧ -b^{7, 103}_1 ∧ -b^{7, 103}_0 ∧ true) 
c  in CNF:
c    -b^{7, 103}_2 ∨  b^{7, 103}_1 ∨  b^{7, 103}_0 ∨ false 
c  in DIMACS:
-10016  10017  10018  0

c  3 does not represent an automaton state.
c    -(-b^{7, 103}_2 ∧  b^{7, 103}_1 ∧  b^{7, 103}_0 ∧ true) 
c  in CNF:
c     b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ false 
c  in DIMACS:
 10016 -10017 -10018  0
c  -3 does not represent an automaton state.
c    -( b^{7, 103}_2 ∧  b^{7, 103}_1 ∧  b^{7, 103}_0 ∧ true) 
c  in CNF:
c    -b^{7, 103}_2 ∨ -b^{7, 103}_1 ∨ -b^{7, 103}_0 ∨ false 
c  in DIMACS:
-10016 -10017 -10018  0

c i = 104
c  -2+1 --> -1
c    ( b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧  p_728) -> ( b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0)
c  in CNF:
c    -b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨  b^{7, 105}_2
c    -b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_1
c    -b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨  b^{7, 105}_0
c  in DIMACS:
-10019 -10020  10021 -728  10022 0
-10019 -10020  10021 -728 -10023 0
-10019 -10020  10021 -728  10024 0

c  -1+1 --> 0
c    ( b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0 ∧  p_728) -> (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧ -b^{7, 105}_0)
c  in CNF:
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_2
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_1
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_0
c  in DIMACS:
-10019  10020 -10021 -728 -10022 0
-10019  10020 -10021 -728 -10023 0
-10019  10020 -10021 -728 -10024 0

c  0+1 --> 1
c    (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧  p_728) -> (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0)
c  in CNF:
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_2
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_1
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨  b^{7, 105}_0
c  in DIMACS:
 10019  10020  10021 -728 -10022 0
 10019  10020  10021 -728 -10023 0
 10019  10020  10021 -728  10024 0

c  1+1 --> 2
c    (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0 ∧  p_728) -> (-b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0)
c  in CNF:
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_2
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨  b^{7, 105}_1
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ -p_728 ∨ -b^{7, 105}_0
c  in DIMACS:
 10019  10020 -10021 -728 -10022 0
 10019  10020 -10021 -728  10023 0
 10019  10020 -10021 -728 -10024 0

c  2+1 --> break 
c    (-b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧  p_728) -> break
c  in CNF:
c     b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 10019 -10020  10021 -728 1162 0


c  2-1 --> 1
c    (-b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧ -p_728) -> (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0)
c  in CNF:
c     b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_2
c     b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_1
c     b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨  b^{7, 105}_0
c  in DIMACS:
 10019 -10020  10021  728 -10022 0
 10019 -10020  10021  728 -10023 0
 10019 -10020  10021  728  10024 0

c  1-1 --> 0
c    (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0 ∧ -p_728) -> (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧ -b^{7, 105}_0)
c  in CNF:
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_2
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_1
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_0
c  in DIMACS:
 10019  10020 -10021  728 -10022 0
 10019  10020 -10021  728 -10023 0
 10019  10020 -10021  728 -10024 0

c  0-1 --> -1
c    (-b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧ -p_728) -> ( b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0)
c  in CNF:
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨  b^{7, 105}_2
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_1
c     b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨  b^{7, 105}_0
c  in DIMACS:
 10019  10020  10021  728  10022 0
 10019  10020  10021  728 -10023 0
 10019  10020  10021  728  10024 0

c  -1-1 --> -2
c    ( b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧  b^{7, 104}_0 ∧ -p_728) -> ( b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0)
c  in CNF:
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨  b^{7, 105}_2
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨  b^{7, 105}_1
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨  p_728 ∨ -b^{7, 105}_0
c  in DIMACS:
-10019  10020 -10021  728  10022 0
-10019  10020 -10021  728  10023 0
-10019  10020 -10021  728 -10024 0

c  -2-1 --> break 
c    ( b^{7, 104}_2 ∧  b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨  b^{7, 104}_0 ∨  p_728 ∨ break
c  in DIMACS:
-10019 -10020  10021  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 104}_2 ∧ -b^{7, 104}_1 ∧ -b^{7, 104}_0 ∧ true) 
c  in CNF:
c    -b^{7, 104}_2 ∨  b^{7, 104}_1 ∨  b^{7, 104}_0 ∨ false 
c  in DIMACS:
-10019  10020  10021  0

c  3 does not represent an automaton state.
c    -(-b^{7, 104}_2 ∧  b^{7, 104}_1 ∧  b^{7, 104}_0 ∧ true) 
c  in CNF:
c     b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ false 
c  in DIMACS:
 10019 -10020 -10021  0
c  -3 does not represent an automaton state.
c    -( b^{7, 104}_2 ∧  b^{7, 104}_1 ∧  b^{7, 104}_0 ∧ true) 
c  in CNF:
c    -b^{7, 104}_2 ∨ -b^{7, 104}_1 ∨ -b^{7, 104}_0 ∨ false 
c  in DIMACS:
-10019 -10020 -10021  0

c i = 105
c  -2+1 --> -1
c    ( b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧  p_735) -> ( b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0)
c  in CNF:
c    -b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨  b^{7, 106}_2
c    -b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_1
c    -b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨  b^{7, 106}_0
c  in DIMACS:
-10022 -10023  10024 -735  10025 0
-10022 -10023  10024 -735 -10026 0
-10022 -10023  10024 -735  10027 0

c  -1+1 --> 0
c    ( b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0 ∧  p_735) -> (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧ -b^{7, 106}_0)
c  in CNF:
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_2
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_1
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_0
c  in DIMACS:
-10022  10023 -10024 -735 -10025 0
-10022  10023 -10024 -735 -10026 0
-10022  10023 -10024 -735 -10027 0

c  0+1 --> 1
c    (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧  p_735) -> (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0)
c  in CNF:
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_2
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_1
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨  b^{7, 106}_0
c  in DIMACS:
 10022  10023  10024 -735 -10025 0
 10022  10023  10024 -735 -10026 0
 10022  10023  10024 -735  10027 0

c  1+1 --> 2
c    (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0 ∧  p_735) -> (-b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0)
c  in CNF:
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_2
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨  b^{7, 106}_1
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ -p_735 ∨ -b^{7, 106}_0
c  in DIMACS:
 10022  10023 -10024 -735 -10025 0
 10022  10023 -10024 -735  10026 0
 10022  10023 -10024 -735 -10027 0

c  2+1 --> break 
c    (-b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧  p_735) -> break
c  in CNF:
c     b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 10022 -10023  10024 -735 1162 0


c  2-1 --> 1
c    (-b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧ -p_735) -> (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0)
c  in CNF:
c     b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_2
c     b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_1
c     b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨  b^{7, 106}_0
c  in DIMACS:
 10022 -10023  10024  735 -10025 0
 10022 -10023  10024  735 -10026 0
 10022 -10023  10024  735  10027 0

c  1-1 --> 0
c    (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0 ∧ -p_735) -> (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧ -b^{7, 106}_0)
c  in CNF:
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_2
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_1
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_0
c  in DIMACS:
 10022  10023 -10024  735 -10025 0
 10022  10023 -10024  735 -10026 0
 10022  10023 -10024  735 -10027 0

c  0-1 --> -1
c    (-b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧ -p_735) -> ( b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0)
c  in CNF:
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨  b^{7, 106}_2
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_1
c     b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨  b^{7, 106}_0
c  in DIMACS:
 10022  10023  10024  735  10025 0
 10022  10023  10024  735 -10026 0
 10022  10023  10024  735  10027 0

c  -1-1 --> -2
c    ( b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧  b^{7, 105}_0 ∧ -p_735) -> ( b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0)
c  in CNF:
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨  b^{7, 106}_2
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨  b^{7, 106}_1
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨  p_735 ∨ -b^{7, 106}_0
c  in DIMACS:
-10022  10023 -10024  735  10025 0
-10022  10023 -10024  735  10026 0
-10022  10023 -10024  735 -10027 0

c  -2-1 --> break 
c    ( b^{7, 105}_2 ∧  b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨  b^{7, 105}_0 ∨  p_735 ∨ break
c  in DIMACS:
-10022 -10023  10024  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 105}_2 ∧ -b^{7, 105}_1 ∧ -b^{7, 105}_0 ∧ true) 
c  in CNF:
c    -b^{7, 105}_2 ∨  b^{7, 105}_1 ∨  b^{7, 105}_0 ∨ false 
c  in DIMACS:
-10022  10023  10024  0

c  3 does not represent an automaton state.
c    -(-b^{7, 105}_2 ∧  b^{7, 105}_1 ∧  b^{7, 105}_0 ∧ true) 
c  in CNF:
c     b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ false 
c  in DIMACS:
 10022 -10023 -10024  0
c  -3 does not represent an automaton state.
c    -( b^{7, 105}_2 ∧  b^{7, 105}_1 ∧  b^{7, 105}_0 ∧ true) 
c  in CNF:
c    -b^{7, 105}_2 ∨ -b^{7, 105}_1 ∨ -b^{7, 105}_0 ∨ false 
c  in DIMACS:
-10022 -10023 -10024  0

c i = 106
c  -2+1 --> -1
c    ( b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧  p_742) -> ( b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0)
c  in CNF:
c    -b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨  b^{7, 107}_2
c    -b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_1
c    -b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨  b^{7, 107}_0
c  in DIMACS:
-10025 -10026  10027 -742  10028 0
-10025 -10026  10027 -742 -10029 0
-10025 -10026  10027 -742  10030 0

c  -1+1 --> 0
c    ( b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0 ∧  p_742) -> (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧ -b^{7, 107}_0)
c  in CNF:
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_2
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_1
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_0
c  in DIMACS:
-10025  10026 -10027 -742 -10028 0
-10025  10026 -10027 -742 -10029 0
-10025  10026 -10027 -742 -10030 0

c  0+1 --> 1
c    (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧  p_742) -> (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0)
c  in CNF:
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_2
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_1
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨  b^{7, 107}_0
c  in DIMACS:
 10025  10026  10027 -742 -10028 0
 10025  10026  10027 -742 -10029 0
 10025  10026  10027 -742  10030 0

c  1+1 --> 2
c    (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0 ∧  p_742) -> (-b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0)
c  in CNF:
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_2
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨  b^{7, 107}_1
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ -p_742 ∨ -b^{7, 107}_0
c  in DIMACS:
 10025  10026 -10027 -742 -10028 0
 10025  10026 -10027 -742  10029 0
 10025  10026 -10027 -742 -10030 0

c  2+1 --> break 
c    (-b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧  p_742) -> break
c  in CNF:
c     b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 10025 -10026  10027 -742 1162 0


c  2-1 --> 1
c    (-b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧ -p_742) -> (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0)
c  in CNF:
c     b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_2
c     b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_1
c     b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨  b^{7, 107}_0
c  in DIMACS:
 10025 -10026  10027  742 -10028 0
 10025 -10026  10027  742 -10029 0
 10025 -10026  10027  742  10030 0

c  1-1 --> 0
c    (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0 ∧ -p_742) -> (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧ -b^{7, 107}_0)
c  in CNF:
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_2
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_1
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_0
c  in DIMACS:
 10025  10026 -10027  742 -10028 0
 10025  10026 -10027  742 -10029 0
 10025  10026 -10027  742 -10030 0

c  0-1 --> -1
c    (-b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧ -p_742) -> ( b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0)
c  in CNF:
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨  b^{7, 107}_2
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_1
c     b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨  b^{7, 107}_0
c  in DIMACS:
 10025  10026  10027  742  10028 0
 10025  10026  10027  742 -10029 0
 10025  10026  10027  742  10030 0

c  -1-1 --> -2
c    ( b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧  b^{7, 106}_0 ∧ -p_742) -> ( b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0)
c  in CNF:
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨  b^{7, 107}_2
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨  b^{7, 107}_1
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨  p_742 ∨ -b^{7, 107}_0
c  in DIMACS:
-10025  10026 -10027  742  10028 0
-10025  10026 -10027  742  10029 0
-10025  10026 -10027  742 -10030 0

c  -2-1 --> break 
c    ( b^{7, 106}_2 ∧  b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨  b^{7, 106}_0 ∨  p_742 ∨ break
c  in DIMACS:
-10025 -10026  10027  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 106}_2 ∧ -b^{7, 106}_1 ∧ -b^{7, 106}_0 ∧ true) 
c  in CNF:
c    -b^{7, 106}_2 ∨  b^{7, 106}_1 ∨  b^{7, 106}_0 ∨ false 
c  in DIMACS:
-10025  10026  10027  0

c  3 does not represent an automaton state.
c    -(-b^{7, 106}_2 ∧  b^{7, 106}_1 ∧  b^{7, 106}_0 ∧ true) 
c  in CNF:
c     b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ false 
c  in DIMACS:
 10025 -10026 -10027  0
c  -3 does not represent an automaton state.
c    -( b^{7, 106}_2 ∧  b^{7, 106}_1 ∧  b^{7, 106}_0 ∧ true) 
c  in CNF:
c    -b^{7, 106}_2 ∨ -b^{7, 106}_1 ∨ -b^{7, 106}_0 ∨ false 
c  in DIMACS:
-10025 -10026 -10027  0

c i = 107
c  -2+1 --> -1
c    ( b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧  p_749) -> ( b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0)
c  in CNF:
c    -b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨  b^{7, 108}_2
c    -b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_1
c    -b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨  b^{7, 108}_0
c  in DIMACS:
-10028 -10029  10030 -749  10031 0
-10028 -10029  10030 -749 -10032 0
-10028 -10029  10030 -749  10033 0

c  -1+1 --> 0
c    ( b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0 ∧  p_749) -> (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧ -b^{7, 108}_0)
c  in CNF:
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_2
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_1
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_0
c  in DIMACS:
-10028  10029 -10030 -749 -10031 0
-10028  10029 -10030 -749 -10032 0
-10028  10029 -10030 -749 -10033 0

c  0+1 --> 1
c    (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧  p_749) -> (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0)
c  in CNF:
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_2
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_1
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨  b^{7, 108}_0
c  in DIMACS:
 10028  10029  10030 -749 -10031 0
 10028  10029  10030 -749 -10032 0
 10028  10029  10030 -749  10033 0

c  1+1 --> 2
c    (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0 ∧  p_749) -> (-b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0)
c  in CNF:
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_2
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨  b^{7, 108}_1
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ -p_749 ∨ -b^{7, 108}_0
c  in DIMACS:
 10028  10029 -10030 -749 -10031 0
 10028  10029 -10030 -749  10032 0
 10028  10029 -10030 -749 -10033 0

c  2+1 --> break 
c    (-b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧  p_749) -> break
c  in CNF:
c     b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ -p_749 ∨ break
c  in DIMACS:
 10028 -10029  10030 -749 1162 0


c  2-1 --> 1
c    (-b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧ -p_749) -> (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0)
c  in CNF:
c     b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_2
c     b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_1
c     b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨  b^{7, 108}_0
c  in DIMACS:
 10028 -10029  10030  749 -10031 0
 10028 -10029  10030  749 -10032 0
 10028 -10029  10030  749  10033 0

c  1-1 --> 0
c    (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0 ∧ -p_749) -> (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧ -b^{7, 108}_0)
c  in CNF:
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_2
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_1
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_0
c  in DIMACS:
 10028  10029 -10030  749 -10031 0
 10028  10029 -10030  749 -10032 0
 10028  10029 -10030  749 -10033 0

c  0-1 --> -1
c    (-b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧ -p_749) -> ( b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0)
c  in CNF:
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨  b^{7, 108}_2
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_1
c     b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨  b^{7, 108}_0
c  in DIMACS:
 10028  10029  10030  749  10031 0
 10028  10029  10030  749 -10032 0
 10028  10029  10030  749  10033 0

c  -1-1 --> -2
c    ( b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧  b^{7, 107}_0 ∧ -p_749) -> ( b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0)
c  in CNF:
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨  b^{7, 108}_2
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨  b^{7, 108}_1
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨  p_749 ∨ -b^{7, 108}_0
c  in DIMACS:
-10028  10029 -10030  749  10031 0
-10028  10029 -10030  749  10032 0
-10028  10029 -10030  749 -10033 0

c  -2-1 --> break 
c    ( b^{7, 107}_2 ∧  b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧ -p_749) -> break
c  in CNF:
c    -b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨  b^{7, 107}_0 ∨  p_749 ∨ break
c  in DIMACS:
-10028 -10029  10030  749 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 107}_2 ∧ -b^{7, 107}_1 ∧ -b^{7, 107}_0 ∧ true) 
c  in CNF:
c    -b^{7, 107}_2 ∨  b^{7, 107}_1 ∨  b^{7, 107}_0 ∨ false 
c  in DIMACS:
-10028  10029  10030  0

c  3 does not represent an automaton state.
c    -(-b^{7, 107}_2 ∧  b^{7, 107}_1 ∧  b^{7, 107}_0 ∧ true) 
c  in CNF:
c     b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ false 
c  in DIMACS:
 10028 -10029 -10030  0
c  -3 does not represent an automaton state.
c    -( b^{7, 107}_2 ∧  b^{7, 107}_1 ∧  b^{7, 107}_0 ∧ true) 
c  in CNF:
c    -b^{7, 107}_2 ∨ -b^{7, 107}_1 ∨ -b^{7, 107}_0 ∨ false 
c  in DIMACS:
-10028 -10029 -10030  0

c i = 108
c  -2+1 --> -1
c    ( b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧  p_756) -> ( b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0)
c  in CNF:
c    -b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨  b^{7, 109}_2
c    -b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_1
c    -b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨  b^{7, 109}_0
c  in DIMACS:
-10031 -10032  10033 -756  10034 0
-10031 -10032  10033 -756 -10035 0
-10031 -10032  10033 -756  10036 0

c  -1+1 --> 0
c    ( b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0 ∧  p_756) -> (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧ -b^{7, 109}_0)
c  in CNF:
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_2
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_1
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_0
c  in DIMACS:
-10031  10032 -10033 -756 -10034 0
-10031  10032 -10033 -756 -10035 0
-10031  10032 -10033 -756 -10036 0

c  0+1 --> 1
c    (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧  p_756) -> (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0)
c  in CNF:
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_2
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_1
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨  b^{7, 109}_0
c  in DIMACS:
 10031  10032  10033 -756 -10034 0
 10031  10032  10033 -756 -10035 0
 10031  10032  10033 -756  10036 0

c  1+1 --> 2
c    (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0 ∧  p_756) -> (-b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0)
c  in CNF:
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_2
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨  b^{7, 109}_1
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ -p_756 ∨ -b^{7, 109}_0
c  in DIMACS:
 10031  10032 -10033 -756 -10034 0
 10031  10032 -10033 -756  10035 0
 10031  10032 -10033 -756 -10036 0

c  2+1 --> break 
c    (-b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧  p_756) -> break
c  in CNF:
c     b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 10031 -10032  10033 -756 1162 0


c  2-1 --> 1
c    (-b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧ -p_756) -> (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0)
c  in CNF:
c     b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_2
c     b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_1
c     b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨  b^{7, 109}_0
c  in DIMACS:
 10031 -10032  10033  756 -10034 0
 10031 -10032  10033  756 -10035 0
 10031 -10032  10033  756  10036 0

c  1-1 --> 0
c    (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0 ∧ -p_756) -> (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧ -b^{7, 109}_0)
c  in CNF:
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_2
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_1
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_0
c  in DIMACS:
 10031  10032 -10033  756 -10034 0
 10031  10032 -10033  756 -10035 0
 10031  10032 -10033  756 -10036 0

c  0-1 --> -1
c    (-b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧ -p_756) -> ( b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0)
c  in CNF:
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨  b^{7, 109}_2
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_1
c     b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨  b^{7, 109}_0
c  in DIMACS:
 10031  10032  10033  756  10034 0
 10031  10032  10033  756 -10035 0
 10031  10032  10033  756  10036 0

c  -1-1 --> -2
c    ( b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧  b^{7, 108}_0 ∧ -p_756) -> ( b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0)
c  in CNF:
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨  b^{7, 109}_2
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨  b^{7, 109}_1
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨  p_756 ∨ -b^{7, 109}_0
c  in DIMACS:
-10031  10032 -10033  756  10034 0
-10031  10032 -10033  756  10035 0
-10031  10032 -10033  756 -10036 0

c  -2-1 --> break 
c    ( b^{7, 108}_2 ∧  b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨  b^{7, 108}_0 ∨  p_756 ∨ break
c  in DIMACS:
-10031 -10032  10033  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 108}_2 ∧ -b^{7, 108}_1 ∧ -b^{7, 108}_0 ∧ true) 
c  in CNF:
c    -b^{7, 108}_2 ∨  b^{7, 108}_1 ∨  b^{7, 108}_0 ∨ false 
c  in DIMACS:
-10031  10032  10033  0

c  3 does not represent an automaton state.
c    -(-b^{7, 108}_2 ∧  b^{7, 108}_1 ∧  b^{7, 108}_0 ∧ true) 
c  in CNF:
c     b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ false 
c  in DIMACS:
 10031 -10032 -10033  0
c  -3 does not represent an automaton state.
c    -( b^{7, 108}_2 ∧  b^{7, 108}_1 ∧  b^{7, 108}_0 ∧ true) 
c  in CNF:
c    -b^{7, 108}_2 ∨ -b^{7, 108}_1 ∨ -b^{7, 108}_0 ∨ false 
c  in DIMACS:
-10031 -10032 -10033  0

c i = 109
c  -2+1 --> -1
c    ( b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧  p_763) -> ( b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0)
c  in CNF:
c    -b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨  b^{7, 110}_2
c    -b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_1
c    -b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨  b^{7, 110}_0
c  in DIMACS:
-10034 -10035  10036 -763  10037 0
-10034 -10035  10036 -763 -10038 0
-10034 -10035  10036 -763  10039 0

c  -1+1 --> 0
c    ( b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0 ∧  p_763) -> (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧ -b^{7, 110}_0)
c  in CNF:
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_2
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_1
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_0
c  in DIMACS:
-10034  10035 -10036 -763 -10037 0
-10034  10035 -10036 -763 -10038 0
-10034  10035 -10036 -763 -10039 0

c  0+1 --> 1
c    (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧  p_763) -> (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0)
c  in CNF:
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_2
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_1
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨  b^{7, 110}_0
c  in DIMACS:
 10034  10035  10036 -763 -10037 0
 10034  10035  10036 -763 -10038 0
 10034  10035  10036 -763  10039 0

c  1+1 --> 2
c    (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0 ∧  p_763) -> (-b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0)
c  in CNF:
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_2
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨  b^{7, 110}_1
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ -p_763 ∨ -b^{7, 110}_0
c  in DIMACS:
 10034  10035 -10036 -763 -10037 0
 10034  10035 -10036 -763  10038 0
 10034  10035 -10036 -763 -10039 0

c  2+1 --> break 
c    (-b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧  p_763) -> break
c  in CNF:
c     b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ -p_763 ∨ break
c  in DIMACS:
 10034 -10035  10036 -763 1162 0


c  2-1 --> 1
c    (-b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧ -p_763) -> (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0)
c  in CNF:
c     b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_2
c     b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_1
c     b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨  b^{7, 110}_0
c  in DIMACS:
 10034 -10035  10036  763 -10037 0
 10034 -10035  10036  763 -10038 0
 10034 -10035  10036  763  10039 0

c  1-1 --> 0
c    (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0 ∧ -p_763) -> (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧ -b^{7, 110}_0)
c  in CNF:
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_2
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_1
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_0
c  in DIMACS:
 10034  10035 -10036  763 -10037 0
 10034  10035 -10036  763 -10038 0
 10034  10035 -10036  763 -10039 0

c  0-1 --> -1
c    (-b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧ -p_763) -> ( b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0)
c  in CNF:
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨  b^{7, 110}_2
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_1
c     b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨  b^{7, 110}_0
c  in DIMACS:
 10034  10035  10036  763  10037 0
 10034  10035  10036  763 -10038 0
 10034  10035  10036  763  10039 0

c  -1-1 --> -2
c    ( b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧  b^{7, 109}_0 ∧ -p_763) -> ( b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0)
c  in CNF:
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨  b^{7, 110}_2
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨  b^{7, 110}_1
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨  p_763 ∨ -b^{7, 110}_0
c  in DIMACS:
-10034  10035 -10036  763  10037 0
-10034  10035 -10036  763  10038 0
-10034  10035 -10036  763 -10039 0

c  -2-1 --> break 
c    ( b^{7, 109}_2 ∧  b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧ -p_763) -> break
c  in CNF:
c    -b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨  b^{7, 109}_0 ∨  p_763 ∨ break
c  in DIMACS:
-10034 -10035  10036  763 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 109}_2 ∧ -b^{7, 109}_1 ∧ -b^{7, 109}_0 ∧ true) 
c  in CNF:
c    -b^{7, 109}_2 ∨  b^{7, 109}_1 ∨  b^{7, 109}_0 ∨ false 
c  in DIMACS:
-10034  10035  10036  0

c  3 does not represent an automaton state.
c    -(-b^{7, 109}_2 ∧  b^{7, 109}_1 ∧  b^{7, 109}_0 ∧ true) 
c  in CNF:
c     b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ false 
c  in DIMACS:
 10034 -10035 -10036  0
c  -3 does not represent an automaton state.
c    -( b^{7, 109}_2 ∧  b^{7, 109}_1 ∧  b^{7, 109}_0 ∧ true) 
c  in CNF:
c    -b^{7, 109}_2 ∨ -b^{7, 109}_1 ∨ -b^{7, 109}_0 ∨ false 
c  in DIMACS:
-10034 -10035 -10036  0

c i = 110
c  -2+1 --> -1
c    ( b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧  p_770) -> ( b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0)
c  in CNF:
c    -b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨  b^{7, 111}_2
c    -b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_1
c    -b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨  b^{7, 111}_0
c  in DIMACS:
-10037 -10038  10039 -770  10040 0
-10037 -10038  10039 -770 -10041 0
-10037 -10038  10039 -770  10042 0

c  -1+1 --> 0
c    ( b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0 ∧  p_770) -> (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧ -b^{7, 111}_0)
c  in CNF:
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_2
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_1
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_0
c  in DIMACS:
-10037  10038 -10039 -770 -10040 0
-10037  10038 -10039 -770 -10041 0
-10037  10038 -10039 -770 -10042 0

c  0+1 --> 1
c    (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧  p_770) -> (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0)
c  in CNF:
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_2
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_1
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨  b^{7, 111}_0
c  in DIMACS:
 10037  10038  10039 -770 -10040 0
 10037  10038  10039 -770 -10041 0
 10037  10038  10039 -770  10042 0

c  1+1 --> 2
c    (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0 ∧  p_770) -> (-b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0)
c  in CNF:
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_2
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨  b^{7, 111}_1
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ -p_770 ∨ -b^{7, 111}_0
c  in DIMACS:
 10037  10038 -10039 -770 -10040 0
 10037  10038 -10039 -770  10041 0
 10037  10038 -10039 -770 -10042 0

c  2+1 --> break 
c    (-b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧  p_770) -> break
c  in CNF:
c     b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 10037 -10038  10039 -770 1162 0


c  2-1 --> 1
c    (-b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧ -p_770) -> (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0)
c  in CNF:
c     b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_2
c     b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_1
c     b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨  b^{7, 111}_0
c  in DIMACS:
 10037 -10038  10039  770 -10040 0
 10037 -10038  10039  770 -10041 0
 10037 -10038  10039  770  10042 0

c  1-1 --> 0
c    (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0 ∧ -p_770) -> (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧ -b^{7, 111}_0)
c  in CNF:
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_2
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_1
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_0
c  in DIMACS:
 10037  10038 -10039  770 -10040 0
 10037  10038 -10039  770 -10041 0
 10037  10038 -10039  770 -10042 0

c  0-1 --> -1
c    (-b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧ -p_770) -> ( b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0)
c  in CNF:
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨  b^{7, 111}_2
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_1
c     b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨  b^{7, 111}_0
c  in DIMACS:
 10037  10038  10039  770  10040 0
 10037  10038  10039  770 -10041 0
 10037  10038  10039  770  10042 0

c  -1-1 --> -2
c    ( b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧  b^{7, 110}_0 ∧ -p_770) -> ( b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0)
c  in CNF:
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨  b^{7, 111}_2
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨  b^{7, 111}_1
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨  p_770 ∨ -b^{7, 111}_0
c  in DIMACS:
-10037  10038 -10039  770  10040 0
-10037  10038 -10039  770  10041 0
-10037  10038 -10039  770 -10042 0

c  -2-1 --> break 
c    ( b^{7, 110}_2 ∧  b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨  b^{7, 110}_0 ∨  p_770 ∨ break
c  in DIMACS:
-10037 -10038  10039  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 110}_2 ∧ -b^{7, 110}_1 ∧ -b^{7, 110}_0 ∧ true) 
c  in CNF:
c    -b^{7, 110}_2 ∨  b^{7, 110}_1 ∨  b^{7, 110}_0 ∨ false 
c  in DIMACS:
-10037  10038  10039  0

c  3 does not represent an automaton state.
c    -(-b^{7, 110}_2 ∧  b^{7, 110}_1 ∧  b^{7, 110}_0 ∧ true) 
c  in CNF:
c     b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ false 
c  in DIMACS:
 10037 -10038 -10039  0
c  -3 does not represent an automaton state.
c    -( b^{7, 110}_2 ∧  b^{7, 110}_1 ∧  b^{7, 110}_0 ∧ true) 
c  in CNF:
c    -b^{7, 110}_2 ∨ -b^{7, 110}_1 ∨ -b^{7, 110}_0 ∨ false 
c  in DIMACS:
-10037 -10038 -10039  0

c i = 111
c  -2+1 --> -1
c    ( b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧  p_777) -> ( b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0)
c  in CNF:
c    -b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨  b^{7, 112}_2
c    -b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_1
c    -b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨  b^{7, 112}_0
c  in DIMACS:
-10040 -10041  10042 -777  10043 0
-10040 -10041  10042 -777 -10044 0
-10040 -10041  10042 -777  10045 0

c  -1+1 --> 0
c    ( b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0 ∧  p_777) -> (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧ -b^{7, 112}_0)
c  in CNF:
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_2
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_1
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_0
c  in DIMACS:
-10040  10041 -10042 -777 -10043 0
-10040  10041 -10042 -777 -10044 0
-10040  10041 -10042 -777 -10045 0

c  0+1 --> 1
c    (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧  p_777) -> (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0)
c  in CNF:
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_2
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_1
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨  b^{7, 112}_0
c  in DIMACS:
 10040  10041  10042 -777 -10043 0
 10040  10041  10042 -777 -10044 0
 10040  10041  10042 -777  10045 0

c  1+1 --> 2
c    (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0 ∧  p_777) -> (-b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0)
c  in CNF:
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_2
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨  b^{7, 112}_1
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ -p_777 ∨ -b^{7, 112}_0
c  in DIMACS:
 10040  10041 -10042 -777 -10043 0
 10040  10041 -10042 -777  10044 0
 10040  10041 -10042 -777 -10045 0

c  2+1 --> break 
c    (-b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧  p_777) -> break
c  in CNF:
c     b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 10040 -10041  10042 -777 1162 0


c  2-1 --> 1
c    (-b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧ -p_777) -> (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0)
c  in CNF:
c     b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_2
c     b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_1
c     b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨  b^{7, 112}_0
c  in DIMACS:
 10040 -10041  10042  777 -10043 0
 10040 -10041  10042  777 -10044 0
 10040 -10041  10042  777  10045 0

c  1-1 --> 0
c    (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0 ∧ -p_777) -> (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧ -b^{7, 112}_0)
c  in CNF:
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_2
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_1
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_0
c  in DIMACS:
 10040  10041 -10042  777 -10043 0
 10040  10041 -10042  777 -10044 0
 10040  10041 -10042  777 -10045 0

c  0-1 --> -1
c    (-b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧ -p_777) -> ( b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0)
c  in CNF:
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨  b^{7, 112}_2
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_1
c     b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨  b^{7, 112}_0
c  in DIMACS:
 10040  10041  10042  777  10043 0
 10040  10041  10042  777 -10044 0
 10040  10041  10042  777  10045 0

c  -1-1 --> -2
c    ( b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧  b^{7, 111}_0 ∧ -p_777) -> ( b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0)
c  in CNF:
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨  b^{7, 112}_2
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨  b^{7, 112}_1
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨  p_777 ∨ -b^{7, 112}_0
c  in DIMACS:
-10040  10041 -10042  777  10043 0
-10040  10041 -10042  777  10044 0
-10040  10041 -10042  777 -10045 0

c  -2-1 --> break 
c    ( b^{7, 111}_2 ∧  b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨  b^{7, 111}_0 ∨  p_777 ∨ break
c  in DIMACS:
-10040 -10041  10042  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 111}_2 ∧ -b^{7, 111}_1 ∧ -b^{7, 111}_0 ∧ true) 
c  in CNF:
c    -b^{7, 111}_2 ∨  b^{7, 111}_1 ∨  b^{7, 111}_0 ∨ false 
c  in DIMACS:
-10040  10041  10042  0

c  3 does not represent an automaton state.
c    -(-b^{7, 111}_2 ∧  b^{7, 111}_1 ∧  b^{7, 111}_0 ∧ true) 
c  in CNF:
c     b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ false 
c  in DIMACS:
 10040 -10041 -10042  0
c  -3 does not represent an automaton state.
c    -( b^{7, 111}_2 ∧  b^{7, 111}_1 ∧  b^{7, 111}_0 ∧ true) 
c  in CNF:
c    -b^{7, 111}_2 ∨ -b^{7, 111}_1 ∨ -b^{7, 111}_0 ∨ false 
c  in DIMACS:
-10040 -10041 -10042  0

c i = 112
c  -2+1 --> -1
c    ( b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧  p_784) -> ( b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0)
c  in CNF:
c    -b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨  b^{7, 113}_2
c    -b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_1
c    -b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨  b^{7, 113}_0
c  in DIMACS:
-10043 -10044  10045 -784  10046 0
-10043 -10044  10045 -784 -10047 0
-10043 -10044  10045 -784  10048 0

c  -1+1 --> 0
c    ( b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0 ∧  p_784) -> (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧ -b^{7, 113}_0)
c  in CNF:
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_2
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_1
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_0
c  in DIMACS:
-10043  10044 -10045 -784 -10046 0
-10043  10044 -10045 -784 -10047 0
-10043  10044 -10045 -784 -10048 0

c  0+1 --> 1
c    (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧  p_784) -> (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0)
c  in CNF:
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_2
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_1
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨  b^{7, 113}_0
c  in DIMACS:
 10043  10044  10045 -784 -10046 0
 10043  10044  10045 -784 -10047 0
 10043  10044  10045 -784  10048 0

c  1+1 --> 2
c    (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0 ∧  p_784) -> (-b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0)
c  in CNF:
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_2
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨  b^{7, 113}_1
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ -p_784 ∨ -b^{7, 113}_0
c  in DIMACS:
 10043  10044 -10045 -784 -10046 0
 10043  10044 -10045 -784  10047 0
 10043  10044 -10045 -784 -10048 0

c  2+1 --> break 
c    (-b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧  p_784) -> break
c  in CNF:
c     b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 10043 -10044  10045 -784 1162 0


c  2-1 --> 1
c    (-b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧ -p_784) -> (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0)
c  in CNF:
c     b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_2
c     b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_1
c     b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨  b^{7, 113}_0
c  in DIMACS:
 10043 -10044  10045  784 -10046 0
 10043 -10044  10045  784 -10047 0
 10043 -10044  10045  784  10048 0

c  1-1 --> 0
c    (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0 ∧ -p_784) -> (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧ -b^{7, 113}_0)
c  in CNF:
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_2
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_1
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_0
c  in DIMACS:
 10043  10044 -10045  784 -10046 0
 10043  10044 -10045  784 -10047 0
 10043  10044 -10045  784 -10048 0

c  0-1 --> -1
c    (-b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧ -p_784) -> ( b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0)
c  in CNF:
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨  b^{7, 113}_2
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_1
c     b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨  b^{7, 113}_0
c  in DIMACS:
 10043  10044  10045  784  10046 0
 10043  10044  10045  784 -10047 0
 10043  10044  10045  784  10048 0

c  -1-1 --> -2
c    ( b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧  b^{7, 112}_0 ∧ -p_784) -> ( b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0)
c  in CNF:
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨  b^{7, 113}_2
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨  b^{7, 113}_1
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨  p_784 ∨ -b^{7, 113}_0
c  in DIMACS:
-10043  10044 -10045  784  10046 0
-10043  10044 -10045  784  10047 0
-10043  10044 -10045  784 -10048 0

c  -2-1 --> break 
c    ( b^{7, 112}_2 ∧  b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨  b^{7, 112}_0 ∨  p_784 ∨ break
c  in DIMACS:
-10043 -10044  10045  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 112}_2 ∧ -b^{7, 112}_1 ∧ -b^{7, 112}_0 ∧ true) 
c  in CNF:
c    -b^{7, 112}_2 ∨  b^{7, 112}_1 ∨  b^{7, 112}_0 ∨ false 
c  in DIMACS:
-10043  10044  10045  0

c  3 does not represent an automaton state.
c    -(-b^{7, 112}_2 ∧  b^{7, 112}_1 ∧  b^{7, 112}_0 ∧ true) 
c  in CNF:
c     b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ false 
c  in DIMACS:
 10043 -10044 -10045  0
c  -3 does not represent an automaton state.
c    -( b^{7, 112}_2 ∧  b^{7, 112}_1 ∧  b^{7, 112}_0 ∧ true) 
c  in CNF:
c    -b^{7, 112}_2 ∨ -b^{7, 112}_1 ∨ -b^{7, 112}_0 ∨ false 
c  in DIMACS:
-10043 -10044 -10045  0

c i = 113
c  -2+1 --> -1
c    ( b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧  p_791) -> ( b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0)
c  in CNF:
c    -b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨  b^{7, 114}_2
c    -b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_1
c    -b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨  b^{7, 114}_0
c  in DIMACS:
-10046 -10047  10048 -791  10049 0
-10046 -10047  10048 -791 -10050 0
-10046 -10047  10048 -791  10051 0

c  -1+1 --> 0
c    ( b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0 ∧  p_791) -> (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧ -b^{7, 114}_0)
c  in CNF:
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_2
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_1
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_0
c  in DIMACS:
-10046  10047 -10048 -791 -10049 0
-10046  10047 -10048 -791 -10050 0
-10046  10047 -10048 -791 -10051 0

c  0+1 --> 1
c    (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧  p_791) -> (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0)
c  in CNF:
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_2
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_1
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨  b^{7, 114}_0
c  in DIMACS:
 10046  10047  10048 -791 -10049 0
 10046  10047  10048 -791 -10050 0
 10046  10047  10048 -791  10051 0

c  1+1 --> 2
c    (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0 ∧  p_791) -> (-b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0)
c  in CNF:
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_2
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨  b^{7, 114}_1
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ -p_791 ∨ -b^{7, 114}_0
c  in DIMACS:
 10046  10047 -10048 -791 -10049 0
 10046  10047 -10048 -791  10050 0
 10046  10047 -10048 -791 -10051 0

c  2+1 --> break 
c    (-b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧  p_791) -> break
c  in CNF:
c     b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ -p_791 ∨ break
c  in DIMACS:
 10046 -10047  10048 -791 1162 0


c  2-1 --> 1
c    (-b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧ -p_791) -> (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0)
c  in CNF:
c     b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_2
c     b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_1
c     b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨  b^{7, 114}_0
c  in DIMACS:
 10046 -10047  10048  791 -10049 0
 10046 -10047  10048  791 -10050 0
 10046 -10047  10048  791  10051 0

c  1-1 --> 0
c    (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0 ∧ -p_791) -> (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧ -b^{7, 114}_0)
c  in CNF:
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_2
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_1
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_0
c  in DIMACS:
 10046  10047 -10048  791 -10049 0
 10046  10047 -10048  791 -10050 0
 10046  10047 -10048  791 -10051 0

c  0-1 --> -1
c    (-b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧ -p_791) -> ( b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0)
c  in CNF:
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨  b^{7, 114}_2
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_1
c     b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨  b^{7, 114}_0
c  in DIMACS:
 10046  10047  10048  791  10049 0
 10046  10047  10048  791 -10050 0
 10046  10047  10048  791  10051 0

c  -1-1 --> -2
c    ( b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧  b^{7, 113}_0 ∧ -p_791) -> ( b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0)
c  in CNF:
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨  b^{7, 114}_2
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨  b^{7, 114}_1
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨  p_791 ∨ -b^{7, 114}_0
c  in DIMACS:
-10046  10047 -10048  791  10049 0
-10046  10047 -10048  791  10050 0
-10046  10047 -10048  791 -10051 0

c  -2-1 --> break 
c    ( b^{7, 113}_2 ∧  b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧ -p_791) -> break
c  in CNF:
c    -b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨  b^{7, 113}_0 ∨  p_791 ∨ break
c  in DIMACS:
-10046 -10047  10048  791 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 113}_2 ∧ -b^{7, 113}_1 ∧ -b^{7, 113}_0 ∧ true) 
c  in CNF:
c    -b^{7, 113}_2 ∨  b^{7, 113}_1 ∨  b^{7, 113}_0 ∨ false 
c  in DIMACS:
-10046  10047  10048  0

c  3 does not represent an automaton state.
c    -(-b^{7, 113}_2 ∧  b^{7, 113}_1 ∧  b^{7, 113}_0 ∧ true) 
c  in CNF:
c     b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ false 
c  in DIMACS:
 10046 -10047 -10048  0
c  -3 does not represent an automaton state.
c    -( b^{7, 113}_2 ∧  b^{7, 113}_1 ∧  b^{7, 113}_0 ∧ true) 
c  in CNF:
c    -b^{7, 113}_2 ∨ -b^{7, 113}_1 ∨ -b^{7, 113}_0 ∨ false 
c  in DIMACS:
-10046 -10047 -10048  0

c i = 114
c  -2+1 --> -1
c    ( b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧  p_798) -> ( b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0)
c  in CNF:
c    -b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨  b^{7, 115}_2
c    -b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_1
c    -b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨  b^{7, 115}_0
c  in DIMACS:
-10049 -10050  10051 -798  10052 0
-10049 -10050  10051 -798 -10053 0
-10049 -10050  10051 -798  10054 0

c  -1+1 --> 0
c    ( b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0 ∧  p_798) -> (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧ -b^{7, 115}_0)
c  in CNF:
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_2
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_1
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_0
c  in DIMACS:
-10049  10050 -10051 -798 -10052 0
-10049  10050 -10051 -798 -10053 0
-10049  10050 -10051 -798 -10054 0

c  0+1 --> 1
c    (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧  p_798) -> (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0)
c  in CNF:
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_2
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_1
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨  b^{7, 115}_0
c  in DIMACS:
 10049  10050  10051 -798 -10052 0
 10049  10050  10051 -798 -10053 0
 10049  10050  10051 -798  10054 0

c  1+1 --> 2
c    (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0 ∧  p_798) -> (-b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0)
c  in CNF:
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_2
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨  b^{7, 115}_1
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ -p_798 ∨ -b^{7, 115}_0
c  in DIMACS:
 10049  10050 -10051 -798 -10052 0
 10049  10050 -10051 -798  10053 0
 10049  10050 -10051 -798 -10054 0

c  2+1 --> break 
c    (-b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧  p_798) -> break
c  in CNF:
c     b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 10049 -10050  10051 -798 1162 0


c  2-1 --> 1
c    (-b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧ -p_798) -> (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0)
c  in CNF:
c     b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_2
c     b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_1
c     b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨  b^{7, 115}_0
c  in DIMACS:
 10049 -10050  10051  798 -10052 0
 10049 -10050  10051  798 -10053 0
 10049 -10050  10051  798  10054 0

c  1-1 --> 0
c    (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0 ∧ -p_798) -> (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧ -b^{7, 115}_0)
c  in CNF:
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_2
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_1
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_0
c  in DIMACS:
 10049  10050 -10051  798 -10052 0
 10049  10050 -10051  798 -10053 0
 10049  10050 -10051  798 -10054 0

c  0-1 --> -1
c    (-b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧ -p_798) -> ( b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0)
c  in CNF:
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨  b^{7, 115}_2
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_1
c     b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨  b^{7, 115}_0
c  in DIMACS:
 10049  10050  10051  798  10052 0
 10049  10050  10051  798 -10053 0
 10049  10050  10051  798  10054 0

c  -1-1 --> -2
c    ( b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧  b^{7, 114}_0 ∧ -p_798) -> ( b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0)
c  in CNF:
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨  b^{7, 115}_2
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨  b^{7, 115}_1
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨  p_798 ∨ -b^{7, 115}_0
c  in DIMACS:
-10049  10050 -10051  798  10052 0
-10049  10050 -10051  798  10053 0
-10049  10050 -10051  798 -10054 0

c  -2-1 --> break 
c    ( b^{7, 114}_2 ∧  b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨  b^{7, 114}_0 ∨  p_798 ∨ break
c  in DIMACS:
-10049 -10050  10051  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 114}_2 ∧ -b^{7, 114}_1 ∧ -b^{7, 114}_0 ∧ true) 
c  in CNF:
c    -b^{7, 114}_2 ∨  b^{7, 114}_1 ∨  b^{7, 114}_0 ∨ false 
c  in DIMACS:
-10049  10050  10051  0

c  3 does not represent an automaton state.
c    -(-b^{7, 114}_2 ∧  b^{7, 114}_1 ∧  b^{7, 114}_0 ∧ true) 
c  in CNF:
c     b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ false 
c  in DIMACS:
 10049 -10050 -10051  0
c  -3 does not represent an automaton state.
c    -( b^{7, 114}_2 ∧  b^{7, 114}_1 ∧  b^{7, 114}_0 ∧ true) 
c  in CNF:
c    -b^{7, 114}_2 ∨ -b^{7, 114}_1 ∨ -b^{7, 114}_0 ∨ false 
c  in DIMACS:
-10049 -10050 -10051  0

c i = 115
c  -2+1 --> -1
c    ( b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧  p_805) -> ( b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0)
c  in CNF:
c    -b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨  b^{7, 116}_2
c    -b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_1
c    -b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨  b^{7, 116}_0
c  in DIMACS:
-10052 -10053  10054 -805  10055 0
-10052 -10053  10054 -805 -10056 0
-10052 -10053  10054 -805  10057 0

c  -1+1 --> 0
c    ( b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0 ∧  p_805) -> (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧ -b^{7, 116}_0)
c  in CNF:
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_2
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_1
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_0
c  in DIMACS:
-10052  10053 -10054 -805 -10055 0
-10052  10053 -10054 -805 -10056 0
-10052  10053 -10054 -805 -10057 0

c  0+1 --> 1
c    (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧  p_805) -> (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0)
c  in CNF:
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_2
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_1
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨  b^{7, 116}_0
c  in DIMACS:
 10052  10053  10054 -805 -10055 0
 10052  10053  10054 -805 -10056 0
 10052  10053  10054 -805  10057 0

c  1+1 --> 2
c    (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0 ∧  p_805) -> (-b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0)
c  in CNF:
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_2
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨  b^{7, 116}_1
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ -p_805 ∨ -b^{7, 116}_0
c  in DIMACS:
 10052  10053 -10054 -805 -10055 0
 10052  10053 -10054 -805  10056 0
 10052  10053 -10054 -805 -10057 0

c  2+1 --> break 
c    (-b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧  p_805) -> break
c  in CNF:
c     b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 10052 -10053  10054 -805 1162 0


c  2-1 --> 1
c    (-b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧ -p_805) -> (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0)
c  in CNF:
c     b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_2
c     b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_1
c     b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨  b^{7, 116}_0
c  in DIMACS:
 10052 -10053  10054  805 -10055 0
 10052 -10053  10054  805 -10056 0
 10052 -10053  10054  805  10057 0

c  1-1 --> 0
c    (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0 ∧ -p_805) -> (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧ -b^{7, 116}_0)
c  in CNF:
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_2
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_1
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_0
c  in DIMACS:
 10052  10053 -10054  805 -10055 0
 10052  10053 -10054  805 -10056 0
 10052  10053 -10054  805 -10057 0

c  0-1 --> -1
c    (-b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧ -p_805) -> ( b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0)
c  in CNF:
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨  b^{7, 116}_2
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_1
c     b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨  b^{7, 116}_0
c  in DIMACS:
 10052  10053  10054  805  10055 0
 10052  10053  10054  805 -10056 0
 10052  10053  10054  805  10057 0

c  -1-1 --> -2
c    ( b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧  b^{7, 115}_0 ∧ -p_805) -> ( b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0)
c  in CNF:
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨  b^{7, 116}_2
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨  b^{7, 116}_1
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨  p_805 ∨ -b^{7, 116}_0
c  in DIMACS:
-10052  10053 -10054  805  10055 0
-10052  10053 -10054  805  10056 0
-10052  10053 -10054  805 -10057 0

c  -2-1 --> break 
c    ( b^{7, 115}_2 ∧  b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨  b^{7, 115}_0 ∨  p_805 ∨ break
c  in DIMACS:
-10052 -10053  10054  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 115}_2 ∧ -b^{7, 115}_1 ∧ -b^{7, 115}_0 ∧ true) 
c  in CNF:
c    -b^{7, 115}_2 ∨  b^{7, 115}_1 ∨  b^{7, 115}_0 ∨ false 
c  in DIMACS:
-10052  10053  10054  0

c  3 does not represent an automaton state.
c    -(-b^{7, 115}_2 ∧  b^{7, 115}_1 ∧  b^{7, 115}_0 ∧ true) 
c  in CNF:
c     b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ false 
c  in DIMACS:
 10052 -10053 -10054  0
c  -3 does not represent an automaton state.
c    -( b^{7, 115}_2 ∧  b^{7, 115}_1 ∧  b^{7, 115}_0 ∧ true) 
c  in CNF:
c    -b^{7, 115}_2 ∨ -b^{7, 115}_1 ∨ -b^{7, 115}_0 ∨ false 
c  in DIMACS:
-10052 -10053 -10054  0

c i = 116
c  -2+1 --> -1
c    ( b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧  p_812) -> ( b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0)
c  in CNF:
c    -b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨  b^{7, 117}_2
c    -b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_1
c    -b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨  b^{7, 117}_0
c  in DIMACS:
-10055 -10056  10057 -812  10058 0
-10055 -10056  10057 -812 -10059 0
-10055 -10056  10057 -812  10060 0

c  -1+1 --> 0
c    ( b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0 ∧  p_812) -> (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧ -b^{7, 117}_0)
c  in CNF:
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_2
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_1
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_0
c  in DIMACS:
-10055  10056 -10057 -812 -10058 0
-10055  10056 -10057 -812 -10059 0
-10055  10056 -10057 -812 -10060 0

c  0+1 --> 1
c    (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧  p_812) -> (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0)
c  in CNF:
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_2
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_1
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨  b^{7, 117}_0
c  in DIMACS:
 10055  10056  10057 -812 -10058 0
 10055  10056  10057 -812 -10059 0
 10055  10056  10057 -812  10060 0

c  1+1 --> 2
c    (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0 ∧  p_812) -> (-b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0)
c  in CNF:
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_2
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨  b^{7, 117}_1
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ -p_812 ∨ -b^{7, 117}_0
c  in DIMACS:
 10055  10056 -10057 -812 -10058 0
 10055  10056 -10057 -812  10059 0
 10055  10056 -10057 -812 -10060 0

c  2+1 --> break 
c    (-b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧  p_812) -> break
c  in CNF:
c     b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 10055 -10056  10057 -812 1162 0


c  2-1 --> 1
c    (-b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧ -p_812) -> (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0)
c  in CNF:
c     b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_2
c     b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_1
c     b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨  b^{7, 117}_0
c  in DIMACS:
 10055 -10056  10057  812 -10058 0
 10055 -10056  10057  812 -10059 0
 10055 -10056  10057  812  10060 0

c  1-1 --> 0
c    (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0 ∧ -p_812) -> (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧ -b^{7, 117}_0)
c  in CNF:
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_2
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_1
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_0
c  in DIMACS:
 10055  10056 -10057  812 -10058 0
 10055  10056 -10057  812 -10059 0
 10055  10056 -10057  812 -10060 0

c  0-1 --> -1
c    (-b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧ -p_812) -> ( b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0)
c  in CNF:
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨  b^{7, 117}_2
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_1
c     b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨  b^{7, 117}_0
c  in DIMACS:
 10055  10056  10057  812  10058 0
 10055  10056  10057  812 -10059 0
 10055  10056  10057  812  10060 0

c  -1-1 --> -2
c    ( b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧  b^{7, 116}_0 ∧ -p_812) -> ( b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0)
c  in CNF:
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨  b^{7, 117}_2
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨  b^{7, 117}_1
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨  p_812 ∨ -b^{7, 117}_0
c  in DIMACS:
-10055  10056 -10057  812  10058 0
-10055  10056 -10057  812  10059 0
-10055  10056 -10057  812 -10060 0

c  -2-1 --> break 
c    ( b^{7, 116}_2 ∧  b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨  b^{7, 116}_0 ∨  p_812 ∨ break
c  in DIMACS:
-10055 -10056  10057  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 116}_2 ∧ -b^{7, 116}_1 ∧ -b^{7, 116}_0 ∧ true) 
c  in CNF:
c    -b^{7, 116}_2 ∨  b^{7, 116}_1 ∨  b^{7, 116}_0 ∨ false 
c  in DIMACS:
-10055  10056  10057  0

c  3 does not represent an automaton state.
c    -(-b^{7, 116}_2 ∧  b^{7, 116}_1 ∧  b^{7, 116}_0 ∧ true) 
c  in CNF:
c     b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ false 
c  in DIMACS:
 10055 -10056 -10057  0
c  -3 does not represent an automaton state.
c    -( b^{7, 116}_2 ∧  b^{7, 116}_1 ∧  b^{7, 116}_0 ∧ true) 
c  in CNF:
c    -b^{7, 116}_2 ∨ -b^{7, 116}_1 ∨ -b^{7, 116}_0 ∨ false 
c  in DIMACS:
-10055 -10056 -10057  0

c i = 117
c  -2+1 --> -1
c    ( b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧  p_819) -> ( b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0)
c  in CNF:
c    -b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨  b^{7, 118}_2
c    -b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_1
c    -b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨  b^{7, 118}_0
c  in DIMACS:
-10058 -10059  10060 -819  10061 0
-10058 -10059  10060 -819 -10062 0
-10058 -10059  10060 -819  10063 0

c  -1+1 --> 0
c    ( b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0 ∧  p_819) -> (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧ -b^{7, 118}_0)
c  in CNF:
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_2
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_1
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_0
c  in DIMACS:
-10058  10059 -10060 -819 -10061 0
-10058  10059 -10060 -819 -10062 0
-10058  10059 -10060 -819 -10063 0

c  0+1 --> 1
c    (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧  p_819) -> (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0)
c  in CNF:
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_2
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_1
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨  b^{7, 118}_0
c  in DIMACS:
 10058  10059  10060 -819 -10061 0
 10058  10059  10060 -819 -10062 0
 10058  10059  10060 -819  10063 0

c  1+1 --> 2
c    (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0 ∧  p_819) -> (-b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0)
c  in CNF:
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_2
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨  b^{7, 118}_1
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ -p_819 ∨ -b^{7, 118}_0
c  in DIMACS:
 10058  10059 -10060 -819 -10061 0
 10058  10059 -10060 -819  10062 0
 10058  10059 -10060 -819 -10063 0

c  2+1 --> break 
c    (-b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧  p_819) -> break
c  in CNF:
c     b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 10058 -10059  10060 -819 1162 0


c  2-1 --> 1
c    (-b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧ -p_819) -> (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0)
c  in CNF:
c     b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_2
c     b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_1
c     b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨  b^{7, 118}_0
c  in DIMACS:
 10058 -10059  10060  819 -10061 0
 10058 -10059  10060  819 -10062 0
 10058 -10059  10060  819  10063 0

c  1-1 --> 0
c    (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0 ∧ -p_819) -> (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧ -b^{7, 118}_0)
c  in CNF:
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_2
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_1
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_0
c  in DIMACS:
 10058  10059 -10060  819 -10061 0
 10058  10059 -10060  819 -10062 0
 10058  10059 -10060  819 -10063 0

c  0-1 --> -1
c    (-b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧ -p_819) -> ( b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0)
c  in CNF:
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨  b^{7, 118}_2
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_1
c     b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨  b^{7, 118}_0
c  in DIMACS:
 10058  10059  10060  819  10061 0
 10058  10059  10060  819 -10062 0
 10058  10059  10060  819  10063 0

c  -1-1 --> -2
c    ( b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧  b^{7, 117}_0 ∧ -p_819) -> ( b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0)
c  in CNF:
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨  b^{7, 118}_2
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨  b^{7, 118}_1
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨  p_819 ∨ -b^{7, 118}_0
c  in DIMACS:
-10058  10059 -10060  819  10061 0
-10058  10059 -10060  819  10062 0
-10058  10059 -10060  819 -10063 0

c  -2-1 --> break 
c    ( b^{7, 117}_2 ∧  b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨  b^{7, 117}_0 ∨  p_819 ∨ break
c  in DIMACS:
-10058 -10059  10060  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 117}_2 ∧ -b^{7, 117}_1 ∧ -b^{7, 117}_0 ∧ true) 
c  in CNF:
c    -b^{7, 117}_2 ∨  b^{7, 117}_1 ∨  b^{7, 117}_0 ∨ false 
c  in DIMACS:
-10058  10059  10060  0

c  3 does not represent an automaton state.
c    -(-b^{7, 117}_2 ∧  b^{7, 117}_1 ∧  b^{7, 117}_0 ∧ true) 
c  in CNF:
c     b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ false 
c  in DIMACS:
 10058 -10059 -10060  0
c  -3 does not represent an automaton state.
c    -( b^{7, 117}_2 ∧  b^{7, 117}_1 ∧  b^{7, 117}_0 ∧ true) 
c  in CNF:
c    -b^{7, 117}_2 ∨ -b^{7, 117}_1 ∨ -b^{7, 117}_0 ∨ false 
c  in DIMACS:
-10058 -10059 -10060  0

c i = 118
c  -2+1 --> -1
c    ( b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧  p_826) -> ( b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0)
c  in CNF:
c    -b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨  b^{7, 119}_2
c    -b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_1
c    -b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨  b^{7, 119}_0
c  in DIMACS:
-10061 -10062  10063 -826  10064 0
-10061 -10062  10063 -826 -10065 0
-10061 -10062  10063 -826  10066 0

c  -1+1 --> 0
c    ( b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0 ∧  p_826) -> (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧ -b^{7, 119}_0)
c  in CNF:
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_2
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_1
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_0
c  in DIMACS:
-10061  10062 -10063 -826 -10064 0
-10061  10062 -10063 -826 -10065 0
-10061  10062 -10063 -826 -10066 0

c  0+1 --> 1
c    (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧  p_826) -> (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0)
c  in CNF:
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_2
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_1
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨  b^{7, 119}_0
c  in DIMACS:
 10061  10062  10063 -826 -10064 0
 10061  10062  10063 -826 -10065 0
 10061  10062  10063 -826  10066 0

c  1+1 --> 2
c    (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0 ∧  p_826) -> (-b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0)
c  in CNF:
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_2
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨  b^{7, 119}_1
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ -p_826 ∨ -b^{7, 119}_0
c  in DIMACS:
 10061  10062 -10063 -826 -10064 0
 10061  10062 -10063 -826  10065 0
 10061  10062 -10063 -826 -10066 0

c  2+1 --> break 
c    (-b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧  p_826) -> break
c  in CNF:
c     b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 10061 -10062  10063 -826 1162 0


c  2-1 --> 1
c    (-b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧ -p_826) -> (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0)
c  in CNF:
c     b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_2
c     b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_1
c     b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨  b^{7, 119}_0
c  in DIMACS:
 10061 -10062  10063  826 -10064 0
 10061 -10062  10063  826 -10065 0
 10061 -10062  10063  826  10066 0

c  1-1 --> 0
c    (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0 ∧ -p_826) -> (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧ -b^{7, 119}_0)
c  in CNF:
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_2
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_1
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_0
c  in DIMACS:
 10061  10062 -10063  826 -10064 0
 10061  10062 -10063  826 -10065 0
 10061  10062 -10063  826 -10066 0

c  0-1 --> -1
c    (-b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧ -p_826) -> ( b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0)
c  in CNF:
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨  b^{7, 119}_2
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_1
c     b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨  b^{7, 119}_0
c  in DIMACS:
 10061  10062  10063  826  10064 0
 10061  10062  10063  826 -10065 0
 10061  10062  10063  826  10066 0

c  -1-1 --> -2
c    ( b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧  b^{7, 118}_0 ∧ -p_826) -> ( b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0)
c  in CNF:
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨  b^{7, 119}_2
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨  b^{7, 119}_1
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨  p_826 ∨ -b^{7, 119}_0
c  in DIMACS:
-10061  10062 -10063  826  10064 0
-10061  10062 -10063  826  10065 0
-10061  10062 -10063  826 -10066 0

c  -2-1 --> break 
c    ( b^{7, 118}_2 ∧  b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨  b^{7, 118}_0 ∨  p_826 ∨ break
c  in DIMACS:
-10061 -10062  10063  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 118}_2 ∧ -b^{7, 118}_1 ∧ -b^{7, 118}_0 ∧ true) 
c  in CNF:
c    -b^{7, 118}_2 ∨  b^{7, 118}_1 ∨  b^{7, 118}_0 ∨ false 
c  in DIMACS:
-10061  10062  10063  0

c  3 does not represent an automaton state.
c    -(-b^{7, 118}_2 ∧  b^{7, 118}_1 ∧  b^{7, 118}_0 ∧ true) 
c  in CNF:
c     b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ false 
c  in DIMACS:
 10061 -10062 -10063  0
c  -3 does not represent an automaton state.
c    -( b^{7, 118}_2 ∧  b^{7, 118}_1 ∧  b^{7, 118}_0 ∧ true) 
c  in CNF:
c    -b^{7, 118}_2 ∨ -b^{7, 118}_1 ∨ -b^{7, 118}_0 ∨ false 
c  in DIMACS:
-10061 -10062 -10063  0

c i = 119
c  -2+1 --> -1
c    ( b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧  p_833) -> ( b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0)
c  in CNF:
c    -b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨  b^{7, 120}_2
c    -b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_1
c    -b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨  b^{7, 120}_0
c  in DIMACS:
-10064 -10065  10066 -833  10067 0
-10064 -10065  10066 -833 -10068 0
-10064 -10065  10066 -833  10069 0

c  -1+1 --> 0
c    ( b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0 ∧  p_833) -> (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧ -b^{7, 120}_0)
c  in CNF:
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_2
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_1
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_0
c  in DIMACS:
-10064  10065 -10066 -833 -10067 0
-10064  10065 -10066 -833 -10068 0
-10064  10065 -10066 -833 -10069 0

c  0+1 --> 1
c    (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧  p_833) -> (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0)
c  in CNF:
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_2
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_1
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨  b^{7, 120}_0
c  in DIMACS:
 10064  10065  10066 -833 -10067 0
 10064  10065  10066 -833 -10068 0
 10064  10065  10066 -833  10069 0

c  1+1 --> 2
c    (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0 ∧  p_833) -> (-b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0)
c  in CNF:
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_2
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨  b^{7, 120}_1
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ -p_833 ∨ -b^{7, 120}_0
c  in DIMACS:
 10064  10065 -10066 -833 -10067 0
 10064  10065 -10066 -833  10068 0
 10064  10065 -10066 -833 -10069 0

c  2+1 --> break 
c    (-b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧  p_833) -> break
c  in CNF:
c     b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ -p_833 ∨ break
c  in DIMACS:
 10064 -10065  10066 -833 1162 0


c  2-1 --> 1
c    (-b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧ -p_833) -> (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0)
c  in CNF:
c     b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_2
c     b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_1
c     b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨  b^{7, 120}_0
c  in DIMACS:
 10064 -10065  10066  833 -10067 0
 10064 -10065  10066  833 -10068 0
 10064 -10065  10066  833  10069 0

c  1-1 --> 0
c    (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0 ∧ -p_833) -> (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧ -b^{7, 120}_0)
c  in CNF:
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_2
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_1
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_0
c  in DIMACS:
 10064  10065 -10066  833 -10067 0
 10064  10065 -10066  833 -10068 0
 10064  10065 -10066  833 -10069 0

c  0-1 --> -1
c    (-b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧ -p_833) -> ( b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0)
c  in CNF:
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨  b^{7, 120}_2
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_1
c     b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨  b^{7, 120}_0
c  in DIMACS:
 10064  10065  10066  833  10067 0
 10064  10065  10066  833 -10068 0
 10064  10065  10066  833  10069 0

c  -1-1 --> -2
c    ( b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧  b^{7, 119}_0 ∧ -p_833) -> ( b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0)
c  in CNF:
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨  b^{7, 120}_2
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨  b^{7, 120}_1
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨  p_833 ∨ -b^{7, 120}_0
c  in DIMACS:
-10064  10065 -10066  833  10067 0
-10064  10065 -10066  833  10068 0
-10064  10065 -10066  833 -10069 0

c  -2-1 --> break 
c    ( b^{7, 119}_2 ∧  b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧ -p_833) -> break
c  in CNF:
c    -b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨  b^{7, 119}_0 ∨  p_833 ∨ break
c  in DIMACS:
-10064 -10065  10066  833 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 119}_2 ∧ -b^{7, 119}_1 ∧ -b^{7, 119}_0 ∧ true) 
c  in CNF:
c    -b^{7, 119}_2 ∨  b^{7, 119}_1 ∨  b^{7, 119}_0 ∨ false 
c  in DIMACS:
-10064  10065  10066  0

c  3 does not represent an automaton state.
c    -(-b^{7, 119}_2 ∧  b^{7, 119}_1 ∧  b^{7, 119}_0 ∧ true) 
c  in CNF:
c     b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ false 
c  in DIMACS:
 10064 -10065 -10066  0
c  -3 does not represent an automaton state.
c    -( b^{7, 119}_2 ∧  b^{7, 119}_1 ∧  b^{7, 119}_0 ∧ true) 
c  in CNF:
c    -b^{7, 119}_2 ∨ -b^{7, 119}_1 ∨ -b^{7, 119}_0 ∨ false 
c  in DIMACS:
-10064 -10065 -10066  0

c i = 120
c  -2+1 --> -1
c    ( b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧  p_840) -> ( b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0)
c  in CNF:
c    -b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨  b^{7, 121}_2
c    -b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_1
c    -b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨  b^{7, 121}_0
c  in DIMACS:
-10067 -10068  10069 -840  10070 0
-10067 -10068  10069 -840 -10071 0
-10067 -10068  10069 -840  10072 0

c  -1+1 --> 0
c    ( b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0 ∧  p_840) -> (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧ -b^{7, 121}_0)
c  in CNF:
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_2
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_1
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_0
c  in DIMACS:
-10067  10068 -10069 -840 -10070 0
-10067  10068 -10069 -840 -10071 0
-10067  10068 -10069 -840 -10072 0

c  0+1 --> 1
c    (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧  p_840) -> (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0)
c  in CNF:
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_2
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_1
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨  b^{7, 121}_0
c  in DIMACS:
 10067  10068  10069 -840 -10070 0
 10067  10068  10069 -840 -10071 0
 10067  10068  10069 -840  10072 0

c  1+1 --> 2
c    (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0 ∧  p_840) -> (-b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0)
c  in CNF:
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_2
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨  b^{7, 121}_1
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ -p_840 ∨ -b^{7, 121}_0
c  in DIMACS:
 10067  10068 -10069 -840 -10070 0
 10067  10068 -10069 -840  10071 0
 10067  10068 -10069 -840 -10072 0

c  2+1 --> break 
c    (-b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧  p_840) -> break
c  in CNF:
c     b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 10067 -10068  10069 -840 1162 0


c  2-1 --> 1
c    (-b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧ -p_840) -> (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0)
c  in CNF:
c     b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_2
c     b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_1
c     b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨  b^{7, 121}_0
c  in DIMACS:
 10067 -10068  10069  840 -10070 0
 10067 -10068  10069  840 -10071 0
 10067 -10068  10069  840  10072 0

c  1-1 --> 0
c    (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0 ∧ -p_840) -> (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧ -b^{7, 121}_0)
c  in CNF:
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_2
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_1
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_0
c  in DIMACS:
 10067  10068 -10069  840 -10070 0
 10067  10068 -10069  840 -10071 0
 10067  10068 -10069  840 -10072 0

c  0-1 --> -1
c    (-b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧ -p_840) -> ( b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0)
c  in CNF:
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨  b^{7, 121}_2
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_1
c     b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨  b^{7, 121}_0
c  in DIMACS:
 10067  10068  10069  840  10070 0
 10067  10068  10069  840 -10071 0
 10067  10068  10069  840  10072 0

c  -1-1 --> -2
c    ( b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧  b^{7, 120}_0 ∧ -p_840) -> ( b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0)
c  in CNF:
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨  b^{7, 121}_2
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨  b^{7, 121}_1
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨  p_840 ∨ -b^{7, 121}_0
c  in DIMACS:
-10067  10068 -10069  840  10070 0
-10067  10068 -10069  840  10071 0
-10067  10068 -10069  840 -10072 0

c  -2-1 --> break 
c    ( b^{7, 120}_2 ∧  b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨  b^{7, 120}_0 ∨  p_840 ∨ break
c  in DIMACS:
-10067 -10068  10069  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 120}_2 ∧ -b^{7, 120}_1 ∧ -b^{7, 120}_0 ∧ true) 
c  in CNF:
c    -b^{7, 120}_2 ∨  b^{7, 120}_1 ∨  b^{7, 120}_0 ∨ false 
c  in DIMACS:
-10067  10068  10069  0

c  3 does not represent an automaton state.
c    -(-b^{7, 120}_2 ∧  b^{7, 120}_1 ∧  b^{7, 120}_0 ∧ true) 
c  in CNF:
c     b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ false 
c  in DIMACS:
 10067 -10068 -10069  0
c  -3 does not represent an automaton state.
c    -( b^{7, 120}_2 ∧  b^{7, 120}_1 ∧  b^{7, 120}_0 ∧ true) 
c  in CNF:
c    -b^{7, 120}_2 ∨ -b^{7, 120}_1 ∨ -b^{7, 120}_0 ∨ false 
c  in DIMACS:
-10067 -10068 -10069  0

c i = 121
c  -2+1 --> -1
c    ( b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧  p_847) -> ( b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0)
c  in CNF:
c    -b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨  b^{7, 122}_2
c    -b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_1
c    -b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨  b^{7, 122}_0
c  in DIMACS:
-10070 -10071  10072 -847  10073 0
-10070 -10071  10072 -847 -10074 0
-10070 -10071  10072 -847  10075 0

c  -1+1 --> 0
c    ( b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0 ∧  p_847) -> (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧ -b^{7, 122}_0)
c  in CNF:
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_2
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_1
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_0
c  in DIMACS:
-10070  10071 -10072 -847 -10073 0
-10070  10071 -10072 -847 -10074 0
-10070  10071 -10072 -847 -10075 0

c  0+1 --> 1
c    (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧  p_847) -> (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0)
c  in CNF:
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_2
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_1
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨  b^{7, 122}_0
c  in DIMACS:
 10070  10071  10072 -847 -10073 0
 10070  10071  10072 -847 -10074 0
 10070  10071  10072 -847  10075 0

c  1+1 --> 2
c    (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0 ∧  p_847) -> (-b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0)
c  in CNF:
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_2
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨  b^{7, 122}_1
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ -p_847 ∨ -b^{7, 122}_0
c  in DIMACS:
 10070  10071 -10072 -847 -10073 0
 10070  10071 -10072 -847  10074 0
 10070  10071 -10072 -847 -10075 0

c  2+1 --> break 
c    (-b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧  p_847) -> break
c  in CNF:
c     b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ -p_847 ∨ break
c  in DIMACS:
 10070 -10071  10072 -847 1162 0


c  2-1 --> 1
c    (-b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧ -p_847) -> (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0)
c  in CNF:
c     b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_2
c     b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_1
c     b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨  b^{7, 122}_0
c  in DIMACS:
 10070 -10071  10072  847 -10073 0
 10070 -10071  10072  847 -10074 0
 10070 -10071  10072  847  10075 0

c  1-1 --> 0
c    (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0 ∧ -p_847) -> (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧ -b^{7, 122}_0)
c  in CNF:
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_2
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_1
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_0
c  in DIMACS:
 10070  10071 -10072  847 -10073 0
 10070  10071 -10072  847 -10074 0
 10070  10071 -10072  847 -10075 0

c  0-1 --> -1
c    (-b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧ -p_847) -> ( b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0)
c  in CNF:
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨  b^{7, 122}_2
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_1
c     b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨  b^{7, 122}_0
c  in DIMACS:
 10070  10071  10072  847  10073 0
 10070  10071  10072  847 -10074 0
 10070  10071  10072  847  10075 0

c  -1-1 --> -2
c    ( b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧  b^{7, 121}_0 ∧ -p_847) -> ( b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0)
c  in CNF:
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨  b^{7, 122}_2
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨  b^{7, 122}_1
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨  p_847 ∨ -b^{7, 122}_0
c  in DIMACS:
-10070  10071 -10072  847  10073 0
-10070  10071 -10072  847  10074 0
-10070  10071 -10072  847 -10075 0

c  -2-1 --> break 
c    ( b^{7, 121}_2 ∧  b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧ -p_847) -> break
c  in CNF:
c    -b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨  b^{7, 121}_0 ∨  p_847 ∨ break
c  in DIMACS:
-10070 -10071  10072  847 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 121}_2 ∧ -b^{7, 121}_1 ∧ -b^{7, 121}_0 ∧ true) 
c  in CNF:
c    -b^{7, 121}_2 ∨  b^{7, 121}_1 ∨  b^{7, 121}_0 ∨ false 
c  in DIMACS:
-10070  10071  10072  0

c  3 does not represent an automaton state.
c    -(-b^{7, 121}_2 ∧  b^{7, 121}_1 ∧  b^{7, 121}_0 ∧ true) 
c  in CNF:
c     b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ false 
c  in DIMACS:
 10070 -10071 -10072  0
c  -3 does not represent an automaton state.
c    -( b^{7, 121}_2 ∧  b^{7, 121}_1 ∧  b^{7, 121}_0 ∧ true) 
c  in CNF:
c    -b^{7, 121}_2 ∨ -b^{7, 121}_1 ∨ -b^{7, 121}_0 ∨ false 
c  in DIMACS:
-10070 -10071 -10072  0

c i = 122
c  -2+1 --> -1
c    ( b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧  p_854) -> ( b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0)
c  in CNF:
c    -b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨  b^{7, 123}_2
c    -b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_1
c    -b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨  b^{7, 123}_0
c  in DIMACS:
-10073 -10074  10075 -854  10076 0
-10073 -10074  10075 -854 -10077 0
-10073 -10074  10075 -854  10078 0

c  -1+1 --> 0
c    ( b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0 ∧  p_854) -> (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧ -b^{7, 123}_0)
c  in CNF:
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_2
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_1
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_0
c  in DIMACS:
-10073  10074 -10075 -854 -10076 0
-10073  10074 -10075 -854 -10077 0
-10073  10074 -10075 -854 -10078 0

c  0+1 --> 1
c    (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧  p_854) -> (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0)
c  in CNF:
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_2
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_1
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨  b^{7, 123}_0
c  in DIMACS:
 10073  10074  10075 -854 -10076 0
 10073  10074  10075 -854 -10077 0
 10073  10074  10075 -854  10078 0

c  1+1 --> 2
c    (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0 ∧  p_854) -> (-b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0)
c  in CNF:
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_2
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨  b^{7, 123}_1
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ -p_854 ∨ -b^{7, 123}_0
c  in DIMACS:
 10073  10074 -10075 -854 -10076 0
 10073  10074 -10075 -854  10077 0
 10073  10074 -10075 -854 -10078 0

c  2+1 --> break 
c    (-b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧  p_854) -> break
c  in CNF:
c     b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 10073 -10074  10075 -854 1162 0


c  2-1 --> 1
c    (-b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧ -p_854) -> (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0)
c  in CNF:
c     b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_2
c     b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_1
c     b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨  b^{7, 123}_0
c  in DIMACS:
 10073 -10074  10075  854 -10076 0
 10073 -10074  10075  854 -10077 0
 10073 -10074  10075  854  10078 0

c  1-1 --> 0
c    (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0 ∧ -p_854) -> (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧ -b^{7, 123}_0)
c  in CNF:
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_2
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_1
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_0
c  in DIMACS:
 10073  10074 -10075  854 -10076 0
 10073  10074 -10075  854 -10077 0
 10073  10074 -10075  854 -10078 0

c  0-1 --> -1
c    (-b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧ -p_854) -> ( b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0)
c  in CNF:
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨  b^{7, 123}_2
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_1
c     b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨  b^{7, 123}_0
c  in DIMACS:
 10073  10074  10075  854  10076 0
 10073  10074  10075  854 -10077 0
 10073  10074  10075  854  10078 0

c  -1-1 --> -2
c    ( b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧  b^{7, 122}_0 ∧ -p_854) -> ( b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0)
c  in CNF:
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨  b^{7, 123}_2
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨  b^{7, 123}_1
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨  p_854 ∨ -b^{7, 123}_0
c  in DIMACS:
-10073  10074 -10075  854  10076 0
-10073  10074 -10075  854  10077 0
-10073  10074 -10075  854 -10078 0

c  -2-1 --> break 
c    ( b^{7, 122}_2 ∧  b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨  b^{7, 122}_0 ∨  p_854 ∨ break
c  in DIMACS:
-10073 -10074  10075  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 122}_2 ∧ -b^{7, 122}_1 ∧ -b^{7, 122}_0 ∧ true) 
c  in CNF:
c    -b^{7, 122}_2 ∨  b^{7, 122}_1 ∨  b^{7, 122}_0 ∨ false 
c  in DIMACS:
-10073  10074  10075  0

c  3 does not represent an automaton state.
c    -(-b^{7, 122}_2 ∧  b^{7, 122}_1 ∧  b^{7, 122}_0 ∧ true) 
c  in CNF:
c     b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ false 
c  in DIMACS:
 10073 -10074 -10075  0
c  -3 does not represent an automaton state.
c    -( b^{7, 122}_2 ∧  b^{7, 122}_1 ∧  b^{7, 122}_0 ∧ true) 
c  in CNF:
c    -b^{7, 122}_2 ∨ -b^{7, 122}_1 ∨ -b^{7, 122}_0 ∨ false 
c  in DIMACS:
-10073 -10074 -10075  0

c i = 123
c  -2+1 --> -1
c    ( b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧  p_861) -> ( b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0)
c  in CNF:
c    -b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨  b^{7, 124}_2
c    -b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_1
c    -b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨  b^{7, 124}_0
c  in DIMACS:
-10076 -10077  10078 -861  10079 0
-10076 -10077  10078 -861 -10080 0
-10076 -10077  10078 -861  10081 0

c  -1+1 --> 0
c    ( b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0 ∧  p_861) -> (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧ -b^{7, 124}_0)
c  in CNF:
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_2
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_1
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_0
c  in DIMACS:
-10076  10077 -10078 -861 -10079 0
-10076  10077 -10078 -861 -10080 0
-10076  10077 -10078 -861 -10081 0

c  0+1 --> 1
c    (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧  p_861) -> (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0)
c  in CNF:
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_2
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_1
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨  b^{7, 124}_0
c  in DIMACS:
 10076  10077  10078 -861 -10079 0
 10076  10077  10078 -861 -10080 0
 10076  10077  10078 -861  10081 0

c  1+1 --> 2
c    (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0 ∧  p_861) -> (-b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0)
c  in CNF:
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_2
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨  b^{7, 124}_1
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ -p_861 ∨ -b^{7, 124}_0
c  in DIMACS:
 10076  10077 -10078 -861 -10079 0
 10076  10077 -10078 -861  10080 0
 10076  10077 -10078 -861 -10081 0

c  2+1 --> break 
c    (-b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧  p_861) -> break
c  in CNF:
c     b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 10076 -10077  10078 -861 1162 0


c  2-1 --> 1
c    (-b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧ -p_861) -> (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0)
c  in CNF:
c     b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_2
c     b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_1
c     b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨  b^{7, 124}_0
c  in DIMACS:
 10076 -10077  10078  861 -10079 0
 10076 -10077  10078  861 -10080 0
 10076 -10077  10078  861  10081 0

c  1-1 --> 0
c    (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0 ∧ -p_861) -> (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧ -b^{7, 124}_0)
c  in CNF:
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_2
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_1
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_0
c  in DIMACS:
 10076  10077 -10078  861 -10079 0
 10076  10077 -10078  861 -10080 0
 10076  10077 -10078  861 -10081 0

c  0-1 --> -1
c    (-b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧ -p_861) -> ( b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0)
c  in CNF:
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨  b^{7, 124}_2
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_1
c     b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨  b^{7, 124}_0
c  in DIMACS:
 10076  10077  10078  861  10079 0
 10076  10077  10078  861 -10080 0
 10076  10077  10078  861  10081 0

c  -1-1 --> -2
c    ( b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧  b^{7, 123}_0 ∧ -p_861) -> ( b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0)
c  in CNF:
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨  b^{7, 124}_2
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨  b^{7, 124}_1
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨  p_861 ∨ -b^{7, 124}_0
c  in DIMACS:
-10076  10077 -10078  861  10079 0
-10076  10077 -10078  861  10080 0
-10076  10077 -10078  861 -10081 0

c  -2-1 --> break 
c    ( b^{7, 123}_2 ∧  b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨  b^{7, 123}_0 ∨  p_861 ∨ break
c  in DIMACS:
-10076 -10077  10078  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 123}_2 ∧ -b^{7, 123}_1 ∧ -b^{7, 123}_0 ∧ true) 
c  in CNF:
c    -b^{7, 123}_2 ∨  b^{7, 123}_1 ∨  b^{7, 123}_0 ∨ false 
c  in DIMACS:
-10076  10077  10078  0

c  3 does not represent an automaton state.
c    -(-b^{7, 123}_2 ∧  b^{7, 123}_1 ∧  b^{7, 123}_0 ∧ true) 
c  in CNF:
c     b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ false 
c  in DIMACS:
 10076 -10077 -10078  0
c  -3 does not represent an automaton state.
c    -( b^{7, 123}_2 ∧  b^{7, 123}_1 ∧  b^{7, 123}_0 ∧ true) 
c  in CNF:
c    -b^{7, 123}_2 ∨ -b^{7, 123}_1 ∨ -b^{7, 123}_0 ∨ false 
c  in DIMACS:
-10076 -10077 -10078  0

c i = 124
c  -2+1 --> -1
c    ( b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧  p_868) -> ( b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0)
c  in CNF:
c    -b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨  b^{7, 125}_2
c    -b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_1
c    -b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨  b^{7, 125}_0
c  in DIMACS:
-10079 -10080  10081 -868  10082 0
-10079 -10080  10081 -868 -10083 0
-10079 -10080  10081 -868  10084 0

c  -1+1 --> 0
c    ( b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0 ∧  p_868) -> (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧ -b^{7, 125}_0)
c  in CNF:
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_2
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_1
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_0
c  in DIMACS:
-10079  10080 -10081 -868 -10082 0
-10079  10080 -10081 -868 -10083 0
-10079  10080 -10081 -868 -10084 0

c  0+1 --> 1
c    (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧  p_868) -> (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0)
c  in CNF:
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_2
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_1
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨  b^{7, 125}_0
c  in DIMACS:
 10079  10080  10081 -868 -10082 0
 10079  10080  10081 -868 -10083 0
 10079  10080  10081 -868  10084 0

c  1+1 --> 2
c    (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0 ∧  p_868) -> (-b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0)
c  in CNF:
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_2
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨  b^{7, 125}_1
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ -p_868 ∨ -b^{7, 125}_0
c  in DIMACS:
 10079  10080 -10081 -868 -10082 0
 10079  10080 -10081 -868  10083 0
 10079  10080 -10081 -868 -10084 0

c  2+1 --> break 
c    (-b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧  p_868) -> break
c  in CNF:
c     b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 10079 -10080  10081 -868 1162 0


c  2-1 --> 1
c    (-b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧ -p_868) -> (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0)
c  in CNF:
c     b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_2
c     b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_1
c     b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨  b^{7, 125}_0
c  in DIMACS:
 10079 -10080  10081  868 -10082 0
 10079 -10080  10081  868 -10083 0
 10079 -10080  10081  868  10084 0

c  1-1 --> 0
c    (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0 ∧ -p_868) -> (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧ -b^{7, 125}_0)
c  in CNF:
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_2
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_1
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_0
c  in DIMACS:
 10079  10080 -10081  868 -10082 0
 10079  10080 -10081  868 -10083 0
 10079  10080 -10081  868 -10084 0

c  0-1 --> -1
c    (-b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧ -p_868) -> ( b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0)
c  in CNF:
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨  b^{7, 125}_2
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_1
c     b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨  b^{7, 125}_0
c  in DIMACS:
 10079  10080  10081  868  10082 0
 10079  10080  10081  868 -10083 0
 10079  10080  10081  868  10084 0

c  -1-1 --> -2
c    ( b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧  b^{7, 124}_0 ∧ -p_868) -> ( b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0)
c  in CNF:
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨  b^{7, 125}_2
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨  b^{7, 125}_1
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨  p_868 ∨ -b^{7, 125}_0
c  in DIMACS:
-10079  10080 -10081  868  10082 0
-10079  10080 -10081  868  10083 0
-10079  10080 -10081  868 -10084 0

c  -2-1 --> break 
c    ( b^{7, 124}_2 ∧  b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨  b^{7, 124}_0 ∨  p_868 ∨ break
c  in DIMACS:
-10079 -10080  10081  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 124}_2 ∧ -b^{7, 124}_1 ∧ -b^{7, 124}_0 ∧ true) 
c  in CNF:
c    -b^{7, 124}_2 ∨  b^{7, 124}_1 ∨  b^{7, 124}_0 ∨ false 
c  in DIMACS:
-10079  10080  10081  0

c  3 does not represent an automaton state.
c    -(-b^{7, 124}_2 ∧  b^{7, 124}_1 ∧  b^{7, 124}_0 ∧ true) 
c  in CNF:
c     b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ false 
c  in DIMACS:
 10079 -10080 -10081  0
c  -3 does not represent an automaton state.
c    -( b^{7, 124}_2 ∧  b^{7, 124}_1 ∧  b^{7, 124}_0 ∧ true) 
c  in CNF:
c    -b^{7, 124}_2 ∨ -b^{7, 124}_1 ∨ -b^{7, 124}_0 ∨ false 
c  in DIMACS:
-10079 -10080 -10081  0

c i = 125
c  -2+1 --> -1
c    ( b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧  p_875) -> ( b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0)
c  in CNF:
c    -b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨  b^{7, 126}_2
c    -b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_1
c    -b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨  b^{7, 126}_0
c  in DIMACS:
-10082 -10083  10084 -875  10085 0
-10082 -10083  10084 -875 -10086 0
-10082 -10083  10084 -875  10087 0

c  -1+1 --> 0
c    ( b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0 ∧  p_875) -> (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧ -b^{7, 126}_0)
c  in CNF:
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_2
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_1
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_0
c  in DIMACS:
-10082  10083 -10084 -875 -10085 0
-10082  10083 -10084 -875 -10086 0
-10082  10083 -10084 -875 -10087 0

c  0+1 --> 1
c    (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧  p_875) -> (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0)
c  in CNF:
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_2
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_1
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨  b^{7, 126}_0
c  in DIMACS:
 10082  10083  10084 -875 -10085 0
 10082  10083  10084 -875 -10086 0
 10082  10083  10084 -875  10087 0

c  1+1 --> 2
c    (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0 ∧  p_875) -> (-b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0)
c  in CNF:
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_2
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨  b^{7, 126}_1
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ -p_875 ∨ -b^{7, 126}_0
c  in DIMACS:
 10082  10083 -10084 -875 -10085 0
 10082  10083 -10084 -875  10086 0
 10082  10083 -10084 -875 -10087 0

c  2+1 --> break 
c    (-b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧  p_875) -> break
c  in CNF:
c     b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 10082 -10083  10084 -875 1162 0


c  2-1 --> 1
c    (-b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧ -p_875) -> (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0)
c  in CNF:
c     b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_2
c     b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_1
c     b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨  b^{7, 126}_0
c  in DIMACS:
 10082 -10083  10084  875 -10085 0
 10082 -10083  10084  875 -10086 0
 10082 -10083  10084  875  10087 0

c  1-1 --> 0
c    (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0 ∧ -p_875) -> (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧ -b^{7, 126}_0)
c  in CNF:
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_2
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_1
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_0
c  in DIMACS:
 10082  10083 -10084  875 -10085 0
 10082  10083 -10084  875 -10086 0
 10082  10083 -10084  875 -10087 0

c  0-1 --> -1
c    (-b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧ -p_875) -> ( b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0)
c  in CNF:
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨  b^{7, 126}_2
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_1
c     b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨  b^{7, 126}_0
c  in DIMACS:
 10082  10083  10084  875  10085 0
 10082  10083  10084  875 -10086 0
 10082  10083  10084  875  10087 0

c  -1-1 --> -2
c    ( b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧  b^{7, 125}_0 ∧ -p_875) -> ( b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0)
c  in CNF:
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨  b^{7, 126}_2
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨  b^{7, 126}_1
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨  p_875 ∨ -b^{7, 126}_0
c  in DIMACS:
-10082  10083 -10084  875  10085 0
-10082  10083 -10084  875  10086 0
-10082  10083 -10084  875 -10087 0

c  -2-1 --> break 
c    ( b^{7, 125}_2 ∧  b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨  b^{7, 125}_0 ∨  p_875 ∨ break
c  in DIMACS:
-10082 -10083  10084  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 125}_2 ∧ -b^{7, 125}_1 ∧ -b^{7, 125}_0 ∧ true) 
c  in CNF:
c    -b^{7, 125}_2 ∨  b^{7, 125}_1 ∨  b^{7, 125}_0 ∨ false 
c  in DIMACS:
-10082  10083  10084  0

c  3 does not represent an automaton state.
c    -(-b^{7, 125}_2 ∧  b^{7, 125}_1 ∧  b^{7, 125}_0 ∧ true) 
c  in CNF:
c     b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ false 
c  in DIMACS:
 10082 -10083 -10084  0
c  -3 does not represent an automaton state.
c    -( b^{7, 125}_2 ∧  b^{7, 125}_1 ∧  b^{7, 125}_0 ∧ true) 
c  in CNF:
c    -b^{7, 125}_2 ∨ -b^{7, 125}_1 ∨ -b^{7, 125}_0 ∨ false 
c  in DIMACS:
-10082 -10083 -10084  0

c i = 126
c  -2+1 --> -1
c    ( b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧  p_882) -> ( b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0)
c  in CNF:
c    -b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨  b^{7, 127}_2
c    -b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_1
c    -b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨  b^{7, 127}_0
c  in DIMACS:
-10085 -10086  10087 -882  10088 0
-10085 -10086  10087 -882 -10089 0
-10085 -10086  10087 -882  10090 0

c  -1+1 --> 0
c    ( b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0 ∧  p_882) -> (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧ -b^{7, 127}_0)
c  in CNF:
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_2
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_1
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_0
c  in DIMACS:
-10085  10086 -10087 -882 -10088 0
-10085  10086 -10087 -882 -10089 0
-10085  10086 -10087 -882 -10090 0

c  0+1 --> 1
c    (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧  p_882) -> (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0)
c  in CNF:
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_2
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_1
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨  b^{7, 127}_0
c  in DIMACS:
 10085  10086  10087 -882 -10088 0
 10085  10086  10087 -882 -10089 0
 10085  10086  10087 -882  10090 0

c  1+1 --> 2
c    (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0 ∧  p_882) -> (-b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0)
c  in CNF:
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_2
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨  b^{7, 127}_1
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ -p_882 ∨ -b^{7, 127}_0
c  in DIMACS:
 10085  10086 -10087 -882 -10088 0
 10085  10086 -10087 -882  10089 0
 10085  10086 -10087 -882 -10090 0

c  2+1 --> break 
c    (-b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧  p_882) -> break
c  in CNF:
c     b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 10085 -10086  10087 -882 1162 0


c  2-1 --> 1
c    (-b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧ -p_882) -> (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0)
c  in CNF:
c     b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_2
c     b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_1
c     b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨  b^{7, 127}_0
c  in DIMACS:
 10085 -10086  10087  882 -10088 0
 10085 -10086  10087  882 -10089 0
 10085 -10086  10087  882  10090 0

c  1-1 --> 0
c    (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0 ∧ -p_882) -> (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧ -b^{7, 127}_0)
c  in CNF:
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_2
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_1
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_0
c  in DIMACS:
 10085  10086 -10087  882 -10088 0
 10085  10086 -10087  882 -10089 0
 10085  10086 -10087  882 -10090 0

c  0-1 --> -1
c    (-b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧ -p_882) -> ( b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0)
c  in CNF:
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨  b^{7, 127}_2
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_1
c     b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨  b^{7, 127}_0
c  in DIMACS:
 10085  10086  10087  882  10088 0
 10085  10086  10087  882 -10089 0
 10085  10086  10087  882  10090 0

c  -1-1 --> -2
c    ( b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧  b^{7, 126}_0 ∧ -p_882) -> ( b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0)
c  in CNF:
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨  b^{7, 127}_2
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨  b^{7, 127}_1
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨  p_882 ∨ -b^{7, 127}_0
c  in DIMACS:
-10085  10086 -10087  882  10088 0
-10085  10086 -10087  882  10089 0
-10085  10086 -10087  882 -10090 0

c  -2-1 --> break 
c    ( b^{7, 126}_2 ∧  b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨  b^{7, 126}_0 ∨  p_882 ∨ break
c  in DIMACS:
-10085 -10086  10087  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 126}_2 ∧ -b^{7, 126}_1 ∧ -b^{7, 126}_0 ∧ true) 
c  in CNF:
c    -b^{7, 126}_2 ∨  b^{7, 126}_1 ∨  b^{7, 126}_0 ∨ false 
c  in DIMACS:
-10085  10086  10087  0

c  3 does not represent an automaton state.
c    -(-b^{7, 126}_2 ∧  b^{7, 126}_1 ∧  b^{7, 126}_0 ∧ true) 
c  in CNF:
c     b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ false 
c  in DIMACS:
 10085 -10086 -10087  0
c  -3 does not represent an automaton state.
c    -( b^{7, 126}_2 ∧  b^{7, 126}_1 ∧  b^{7, 126}_0 ∧ true) 
c  in CNF:
c    -b^{7, 126}_2 ∨ -b^{7, 126}_1 ∨ -b^{7, 126}_0 ∨ false 
c  in DIMACS:
-10085 -10086 -10087  0

c i = 127
c  -2+1 --> -1
c    ( b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧  p_889) -> ( b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0)
c  in CNF:
c    -b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨  b^{7, 128}_2
c    -b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_1
c    -b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨  b^{7, 128}_0
c  in DIMACS:
-10088 -10089  10090 -889  10091 0
-10088 -10089  10090 -889 -10092 0
-10088 -10089  10090 -889  10093 0

c  -1+1 --> 0
c    ( b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0 ∧  p_889) -> (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧ -b^{7, 128}_0)
c  in CNF:
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_2
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_1
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_0
c  in DIMACS:
-10088  10089 -10090 -889 -10091 0
-10088  10089 -10090 -889 -10092 0
-10088  10089 -10090 -889 -10093 0

c  0+1 --> 1
c    (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧  p_889) -> (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0)
c  in CNF:
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_2
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_1
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨  b^{7, 128}_0
c  in DIMACS:
 10088  10089  10090 -889 -10091 0
 10088  10089  10090 -889 -10092 0
 10088  10089  10090 -889  10093 0

c  1+1 --> 2
c    (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0 ∧  p_889) -> (-b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0)
c  in CNF:
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_2
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨  b^{7, 128}_1
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ -p_889 ∨ -b^{7, 128}_0
c  in DIMACS:
 10088  10089 -10090 -889 -10091 0
 10088  10089 -10090 -889  10092 0
 10088  10089 -10090 -889 -10093 0

c  2+1 --> break 
c    (-b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧  p_889) -> break
c  in CNF:
c     b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ -p_889 ∨ break
c  in DIMACS:
 10088 -10089  10090 -889 1162 0


c  2-1 --> 1
c    (-b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧ -p_889) -> (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0)
c  in CNF:
c     b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_2
c     b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_1
c     b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨  b^{7, 128}_0
c  in DIMACS:
 10088 -10089  10090  889 -10091 0
 10088 -10089  10090  889 -10092 0
 10088 -10089  10090  889  10093 0

c  1-1 --> 0
c    (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0 ∧ -p_889) -> (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧ -b^{7, 128}_0)
c  in CNF:
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_2
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_1
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_0
c  in DIMACS:
 10088  10089 -10090  889 -10091 0
 10088  10089 -10090  889 -10092 0
 10088  10089 -10090  889 -10093 0

c  0-1 --> -1
c    (-b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧ -p_889) -> ( b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0)
c  in CNF:
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨  b^{7, 128}_2
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_1
c     b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨  b^{7, 128}_0
c  in DIMACS:
 10088  10089  10090  889  10091 0
 10088  10089  10090  889 -10092 0
 10088  10089  10090  889  10093 0

c  -1-1 --> -2
c    ( b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧  b^{7, 127}_0 ∧ -p_889) -> ( b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0)
c  in CNF:
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨  b^{7, 128}_2
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨  b^{7, 128}_1
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨  p_889 ∨ -b^{7, 128}_0
c  in DIMACS:
-10088  10089 -10090  889  10091 0
-10088  10089 -10090  889  10092 0
-10088  10089 -10090  889 -10093 0

c  -2-1 --> break 
c    ( b^{7, 127}_2 ∧  b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧ -p_889) -> break
c  in CNF:
c    -b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨  b^{7, 127}_0 ∨  p_889 ∨ break
c  in DIMACS:
-10088 -10089  10090  889 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 127}_2 ∧ -b^{7, 127}_1 ∧ -b^{7, 127}_0 ∧ true) 
c  in CNF:
c    -b^{7, 127}_2 ∨  b^{7, 127}_1 ∨  b^{7, 127}_0 ∨ false 
c  in DIMACS:
-10088  10089  10090  0

c  3 does not represent an automaton state.
c    -(-b^{7, 127}_2 ∧  b^{7, 127}_1 ∧  b^{7, 127}_0 ∧ true) 
c  in CNF:
c     b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ false 
c  in DIMACS:
 10088 -10089 -10090  0
c  -3 does not represent an automaton state.
c    -( b^{7, 127}_2 ∧  b^{7, 127}_1 ∧  b^{7, 127}_0 ∧ true) 
c  in CNF:
c    -b^{7, 127}_2 ∨ -b^{7, 127}_1 ∨ -b^{7, 127}_0 ∨ false 
c  in DIMACS:
-10088 -10089 -10090  0

c i = 128
c  -2+1 --> -1
c    ( b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧  p_896) -> ( b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0)
c  in CNF:
c    -b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨  b^{7, 129}_2
c    -b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_1
c    -b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨  b^{7, 129}_0
c  in DIMACS:
-10091 -10092  10093 -896  10094 0
-10091 -10092  10093 -896 -10095 0
-10091 -10092  10093 -896  10096 0

c  -1+1 --> 0
c    ( b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0 ∧  p_896) -> (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧ -b^{7, 129}_0)
c  in CNF:
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_2
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_1
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_0
c  in DIMACS:
-10091  10092 -10093 -896 -10094 0
-10091  10092 -10093 -896 -10095 0
-10091  10092 -10093 -896 -10096 0

c  0+1 --> 1
c    (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧  p_896) -> (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0)
c  in CNF:
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_2
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_1
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨  b^{7, 129}_0
c  in DIMACS:
 10091  10092  10093 -896 -10094 0
 10091  10092  10093 -896 -10095 0
 10091  10092  10093 -896  10096 0

c  1+1 --> 2
c    (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0 ∧  p_896) -> (-b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0)
c  in CNF:
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_2
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨  b^{7, 129}_1
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ -p_896 ∨ -b^{7, 129}_0
c  in DIMACS:
 10091  10092 -10093 -896 -10094 0
 10091  10092 -10093 -896  10095 0
 10091  10092 -10093 -896 -10096 0

c  2+1 --> break 
c    (-b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧  p_896) -> break
c  in CNF:
c     b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 10091 -10092  10093 -896 1162 0


c  2-1 --> 1
c    (-b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧ -p_896) -> (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0)
c  in CNF:
c     b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_2
c     b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_1
c     b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨  b^{7, 129}_0
c  in DIMACS:
 10091 -10092  10093  896 -10094 0
 10091 -10092  10093  896 -10095 0
 10091 -10092  10093  896  10096 0

c  1-1 --> 0
c    (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0 ∧ -p_896) -> (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧ -b^{7, 129}_0)
c  in CNF:
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_2
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_1
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_0
c  in DIMACS:
 10091  10092 -10093  896 -10094 0
 10091  10092 -10093  896 -10095 0
 10091  10092 -10093  896 -10096 0

c  0-1 --> -1
c    (-b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧ -p_896) -> ( b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0)
c  in CNF:
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨  b^{7, 129}_2
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_1
c     b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨  b^{7, 129}_0
c  in DIMACS:
 10091  10092  10093  896  10094 0
 10091  10092  10093  896 -10095 0
 10091  10092  10093  896  10096 0

c  -1-1 --> -2
c    ( b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧  b^{7, 128}_0 ∧ -p_896) -> ( b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0)
c  in CNF:
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨  b^{7, 129}_2
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨  b^{7, 129}_1
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨  p_896 ∨ -b^{7, 129}_0
c  in DIMACS:
-10091  10092 -10093  896  10094 0
-10091  10092 -10093  896  10095 0
-10091  10092 -10093  896 -10096 0

c  -2-1 --> break 
c    ( b^{7, 128}_2 ∧  b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨  b^{7, 128}_0 ∨  p_896 ∨ break
c  in DIMACS:
-10091 -10092  10093  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 128}_2 ∧ -b^{7, 128}_1 ∧ -b^{7, 128}_0 ∧ true) 
c  in CNF:
c    -b^{7, 128}_2 ∨  b^{7, 128}_1 ∨  b^{7, 128}_0 ∨ false 
c  in DIMACS:
-10091  10092  10093  0

c  3 does not represent an automaton state.
c    -(-b^{7, 128}_2 ∧  b^{7, 128}_1 ∧  b^{7, 128}_0 ∧ true) 
c  in CNF:
c     b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ false 
c  in DIMACS:
 10091 -10092 -10093  0
c  -3 does not represent an automaton state.
c    -( b^{7, 128}_2 ∧  b^{7, 128}_1 ∧  b^{7, 128}_0 ∧ true) 
c  in CNF:
c    -b^{7, 128}_2 ∨ -b^{7, 128}_1 ∨ -b^{7, 128}_0 ∨ false 
c  in DIMACS:
-10091 -10092 -10093  0

c i = 129
c  -2+1 --> -1
c    ( b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧  p_903) -> ( b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0)
c  in CNF:
c    -b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨  b^{7, 130}_2
c    -b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_1
c    -b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨  b^{7, 130}_0
c  in DIMACS:
-10094 -10095  10096 -903  10097 0
-10094 -10095  10096 -903 -10098 0
-10094 -10095  10096 -903  10099 0

c  -1+1 --> 0
c    ( b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0 ∧  p_903) -> (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧ -b^{7, 130}_0)
c  in CNF:
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_2
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_1
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_0
c  in DIMACS:
-10094  10095 -10096 -903 -10097 0
-10094  10095 -10096 -903 -10098 0
-10094  10095 -10096 -903 -10099 0

c  0+1 --> 1
c    (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧  p_903) -> (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0)
c  in CNF:
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_2
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_1
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨  b^{7, 130}_0
c  in DIMACS:
 10094  10095  10096 -903 -10097 0
 10094  10095  10096 -903 -10098 0
 10094  10095  10096 -903  10099 0

c  1+1 --> 2
c    (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0 ∧  p_903) -> (-b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0)
c  in CNF:
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_2
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨  b^{7, 130}_1
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ -p_903 ∨ -b^{7, 130}_0
c  in DIMACS:
 10094  10095 -10096 -903 -10097 0
 10094  10095 -10096 -903  10098 0
 10094  10095 -10096 -903 -10099 0

c  2+1 --> break 
c    (-b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧  p_903) -> break
c  in CNF:
c     b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 10094 -10095  10096 -903 1162 0


c  2-1 --> 1
c    (-b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧ -p_903) -> (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0)
c  in CNF:
c     b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_2
c     b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_1
c     b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨  b^{7, 130}_0
c  in DIMACS:
 10094 -10095  10096  903 -10097 0
 10094 -10095  10096  903 -10098 0
 10094 -10095  10096  903  10099 0

c  1-1 --> 0
c    (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0 ∧ -p_903) -> (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧ -b^{7, 130}_0)
c  in CNF:
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_2
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_1
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_0
c  in DIMACS:
 10094  10095 -10096  903 -10097 0
 10094  10095 -10096  903 -10098 0
 10094  10095 -10096  903 -10099 0

c  0-1 --> -1
c    (-b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧ -p_903) -> ( b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0)
c  in CNF:
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨  b^{7, 130}_2
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_1
c     b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨  b^{7, 130}_0
c  in DIMACS:
 10094  10095  10096  903  10097 0
 10094  10095  10096  903 -10098 0
 10094  10095  10096  903  10099 0

c  -1-1 --> -2
c    ( b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧  b^{7, 129}_0 ∧ -p_903) -> ( b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0)
c  in CNF:
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨  b^{7, 130}_2
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨  b^{7, 130}_1
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨  p_903 ∨ -b^{7, 130}_0
c  in DIMACS:
-10094  10095 -10096  903  10097 0
-10094  10095 -10096  903  10098 0
-10094  10095 -10096  903 -10099 0

c  -2-1 --> break 
c    ( b^{7, 129}_2 ∧  b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨  b^{7, 129}_0 ∨  p_903 ∨ break
c  in DIMACS:
-10094 -10095  10096  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 129}_2 ∧ -b^{7, 129}_1 ∧ -b^{7, 129}_0 ∧ true) 
c  in CNF:
c    -b^{7, 129}_2 ∨  b^{7, 129}_1 ∨  b^{7, 129}_0 ∨ false 
c  in DIMACS:
-10094  10095  10096  0

c  3 does not represent an automaton state.
c    -(-b^{7, 129}_2 ∧  b^{7, 129}_1 ∧  b^{7, 129}_0 ∧ true) 
c  in CNF:
c     b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ false 
c  in DIMACS:
 10094 -10095 -10096  0
c  -3 does not represent an automaton state.
c    -( b^{7, 129}_2 ∧  b^{7, 129}_1 ∧  b^{7, 129}_0 ∧ true) 
c  in CNF:
c    -b^{7, 129}_2 ∨ -b^{7, 129}_1 ∨ -b^{7, 129}_0 ∨ false 
c  in DIMACS:
-10094 -10095 -10096  0

c i = 130
c  -2+1 --> -1
c    ( b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧  p_910) -> ( b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0)
c  in CNF:
c    -b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨  b^{7, 131}_2
c    -b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_1
c    -b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨  b^{7, 131}_0
c  in DIMACS:
-10097 -10098  10099 -910  10100 0
-10097 -10098  10099 -910 -10101 0
-10097 -10098  10099 -910  10102 0

c  -1+1 --> 0
c    ( b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0 ∧  p_910) -> (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧ -b^{7, 131}_0)
c  in CNF:
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_2
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_1
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_0
c  in DIMACS:
-10097  10098 -10099 -910 -10100 0
-10097  10098 -10099 -910 -10101 0
-10097  10098 -10099 -910 -10102 0

c  0+1 --> 1
c    (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧  p_910) -> (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0)
c  in CNF:
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_2
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_1
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨  b^{7, 131}_0
c  in DIMACS:
 10097  10098  10099 -910 -10100 0
 10097  10098  10099 -910 -10101 0
 10097  10098  10099 -910  10102 0

c  1+1 --> 2
c    (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0 ∧  p_910) -> (-b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0)
c  in CNF:
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_2
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨  b^{7, 131}_1
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ -p_910 ∨ -b^{7, 131}_0
c  in DIMACS:
 10097  10098 -10099 -910 -10100 0
 10097  10098 -10099 -910  10101 0
 10097  10098 -10099 -910 -10102 0

c  2+1 --> break 
c    (-b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧  p_910) -> break
c  in CNF:
c     b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 10097 -10098  10099 -910 1162 0


c  2-1 --> 1
c    (-b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧ -p_910) -> (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0)
c  in CNF:
c     b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_2
c     b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_1
c     b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨  b^{7, 131}_0
c  in DIMACS:
 10097 -10098  10099  910 -10100 0
 10097 -10098  10099  910 -10101 0
 10097 -10098  10099  910  10102 0

c  1-1 --> 0
c    (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0 ∧ -p_910) -> (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧ -b^{7, 131}_0)
c  in CNF:
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_2
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_1
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_0
c  in DIMACS:
 10097  10098 -10099  910 -10100 0
 10097  10098 -10099  910 -10101 0
 10097  10098 -10099  910 -10102 0

c  0-1 --> -1
c    (-b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧ -p_910) -> ( b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0)
c  in CNF:
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨  b^{7, 131}_2
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_1
c     b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨  b^{7, 131}_0
c  in DIMACS:
 10097  10098  10099  910  10100 0
 10097  10098  10099  910 -10101 0
 10097  10098  10099  910  10102 0

c  -1-1 --> -2
c    ( b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧  b^{7, 130}_0 ∧ -p_910) -> ( b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0)
c  in CNF:
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨  b^{7, 131}_2
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨  b^{7, 131}_1
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨  p_910 ∨ -b^{7, 131}_0
c  in DIMACS:
-10097  10098 -10099  910  10100 0
-10097  10098 -10099  910  10101 0
-10097  10098 -10099  910 -10102 0

c  -2-1 --> break 
c    ( b^{7, 130}_2 ∧  b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨  b^{7, 130}_0 ∨  p_910 ∨ break
c  in DIMACS:
-10097 -10098  10099  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 130}_2 ∧ -b^{7, 130}_1 ∧ -b^{7, 130}_0 ∧ true) 
c  in CNF:
c    -b^{7, 130}_2 ∨  b^{7, 130}_1 ∨  b^{7, 130}_0 ∨ false 
c  in DIMACS:
-10097  10098  10099  0

c  3 does not represent an automaton state.
c    -(-b^{7, 130}_2 ∧  b^{7, 130}_1 ∧  b^{7, 130}_0 ∧ true) 
c  in CNF:
c     b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ false 
c  in DIMACS:
 10097 -10098 -10099  0
c  -3 does not represent an automaton state.
c    -( b^{7, 130}_2 ∧  b^{7, 130}_1 ∧  b^{7, 130}_0 ∧ true) 
c  in CNF:
c    -b^{7, 130}_2 ∨ -b^{7, 130}_1 ∨ -b^{7, 130}_0 ∨ false 
c  in DIMACS:
-10097 -10098 -10099  0

c i = 131
c  -2+1 --> -1
c    ( b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧  p_917) -> ( b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0)
c  in CNF:
c    -b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨  b^{7, 132}_2
c    -b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_1
c    -b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨  b^{7, 132}_0
c  in DIMACS:
-10100 -10101  10102 -917  10103 0
-10100 -10101  10102 -917 -10104 0
-10100 -10101  10102 -917  10105 0

c  -1+1 --> 0
c    ( b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0 ∧  p_917) -> (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧ -b^{7, 132}_0)
c  in CNF:
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_2
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_1
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_0
c  in DIMACS:
-10100  10101 -10102 -917 -10103 0
-10100  10101 -10102 -917 -10104 0
-10100  10101 -10102 -917 -10105 0

c  0+1 --> 1
c    (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧  p_917) -> (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0)
c  in CNF:
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_2
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_1
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨  b^{7, 132}_0
c  in DIMACS:
 10100  10101  10102 -917 -10103 0
 10100  10101  10102 -917 -10104 0
 10100  10101  10102 -917  10105 0

c  1+1 --> 2
c    (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0 ∧  p_917) -> (-b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0)
c  in CNF:
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_2
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨  b^{7, 132}_1
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ -p_917 ∨ -b^{7, 132}_0
c  in DIMACS:
 10100  10101 -10102 -917 -10103 0
 10100  10101 -10102 -917  10104 0
 10100  10101 -10102 -917 -10105 0

c  2+1 --> break 
c    (-b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧  p_917) -> break
c  in CNF:
c     b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ -p_917 ∨ break
c  in DIMACS:
 10100 -10101  10102 -917 1162 0


c  2-1 --> 1
c    (-b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧ -p_917) -> (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0)
c  in CNF:
c     b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_2
c     b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_1
c     b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨  b^{7, 132}_0
c  in DIMACS:
 10100 -10101  10102  917 -10103 0
 10100 -10101  10102  917 -10104 0
 10100 -10101  10102  917  10105 0

c  1-1 --> 0
c    (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0 ∧ -p_917) -> (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧ -b^{7, 132}_0)
c  in CNF:
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_2
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_1
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_0
c  in DIMACS:
 10100  10101 -10102  917 -10103 0
 10100  10101 -10102  917 -10104 0
 10100  10101 -10102  917 -10105 0

c  0-1 --> -1
c    (-b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧ -p_917) -> ( b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0)
c  in CNF:
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨  b^{7, 132}_2
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_1
c     b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨  b^{7, 132}_0
c  in DIMACS:
 10100  10101  10102  917  10103 0
 10100  10101  10102  917 -10104 0
 10100  10101  10102  917  10105 0

c  -1-1 --> -2
c    ( b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧  b^{7, 131}_0 ∧ -p_917) -> ( b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0)
c  in CNF:
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨  b^{7, 132}_2
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨  b^{7, 132}_1
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨  p_917 ∨ -b^{7, 132}_0
c  in DIMACS:
-10100  10101 -10102  917  10103 0
-10100  10101 -10102  917  10104 0
-10100  10101 -10102  917 -10105 0

c  -2-1 --> break 
c    ( b^{7, 131}_2 ∧  b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧ -p_917) -> break
c  in CNF:
c    -b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨  b^{7, 131}_0 ∨  p_917 ∨ break
c  in DIMACS:
-10100 -10101  10102  917 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 131}_2 ∧ -b^{7, 131}_1 ∧ -b^{7, 131}_0 ∧ true) 
c  in CNF:
c    -b^{7, 131}_2 ∨  b^{7, 131}_1 ∨  b^{7, 131}_0 ∨ false 
c  in DIMACS:
-10100  10101  10102  0

c  3 does not represent an automaton state.
c    -(-b^{7, 131}_2 ∧  b^{7, 131}_1 ∧  b^{7, 131}_0 ∧ true) 
c  in CNF:
c     b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ false 
c  in DIMACS:
 10100 -10101 -10102  0
c  -3 does not represent an automaton state.
c    -( b^{7, 131}_2 ∧  b^{7, 131}_1 ∧  b^{7, 131}_0 ∧ true) 
c  in CNF:
c    -b^{7, 131}_2 ∨ -b^{7, 131}_1 ∨ -b^{7, 131}_0 ∨ false 
c  in DIMACS:
-10100 -10101 -10102  0

c i = 132
c  -2+1 --> -1
c    ( b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧  p_924) -> ( b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0)
c  in CNF:
c    -b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨  b^{7, 133}_2
c    -b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_1
c    -b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨  b^{7, 133}_0
c  in DIMACS:
-10103 -10104  10105 -924  10106 0
-10103 -10104  10105 -924 -10107 0
-10103 -10104  10105 -924  10108 0

c  -1+1 --> 0
c    ( b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0 ∧  p_924) -> (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧ -b^{7, 133}_0)
c  in CNF:
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_2
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_1
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_0
c  in DIMACS:
-10103  10104 -10105 -924 -10106 0
-10103  10104 -10105 -924 -10107 0
-10103  10104 -10105 -924 -10108 0

c  0+1 --> 1
c    (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧  p_924) -> (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0)
c  in CNF:
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_2
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_1
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨  b^{7, 133}_0
c  in DIMACS:
 10103  10104  10105 -924 -10106 0
 10103  10104  10105 -924 -10107 0
 10103  10104  10105 -924  10108 0

c  1+1 --> 2
c    (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0 ∧  p_924) -> (-b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0)
c  in CNF:
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_2
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨  b^{7, 133}_1
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ -p_924 ∨ -b^{7, 133}_0
c  in DIMACS:
 10103  10104 -10105 -924 -10106 0
 10103  10104 -10105 -924  10107 0
 10103  10104 -10105 -924 -10108 0

c  2+1 --> break 
c    (-b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧  p_924) -> break
c  in CNF:
c     b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 10103 -10104  10105 -924 1162 0


c  2-1 --> 1
c    (-b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧ -p_924) -> (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0)
c  in CNF:
c     b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_2
c     b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_1
c     b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨  b^{7, 133}_0
c  in DIMACS:
 10103 -10104  10105  924 -10106 0
 10103 -10104  10105  924 -10107 0
 10103 -10104  10105  924  10108 0

c  1-1 --> 0
c    (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0 ∧ -p_924) -> (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧ -b^{7, 133}_0)
c  in CNF:
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_2
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_1
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_0
c  in DIMACS:
 10103  10104 -10105  924 -10106 0
 10103  10104 -10105  924 -10107 0
 10103  10104 -10105  924 -10108 0

c  0-1 --> -1
c    (-b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧ -p_924) -> ( b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0)
c  in CNF:
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨  b^{7, 133}_2
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_1
c     b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨  b^{7, 133}_0
c  in DIMACS:
 10103  10104  10105  924  10106 0
 10103  10104  10105  924 -10107 0
 10103  10104  10105  924  10108 0

c  -1-1 --> -2
c    ( b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧  b^{7, 132}_0 ∧ -p_924) -> ( b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0)
c  in CNF:
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨  b^{7, 133}_2
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨  b^{7, 133}_1
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨  p_924 ∨ -b^{7, 133}_0
c  in DIMACS:
-10103  10104 -10105  924  10106 0
-10103  10104 -10105  924  10107 0
-10103  10104 -10105  924 -10108 0

c  -2-1 --> break 
c    ( b^{7, 132}_2 ∧  b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨  b^{7, 132}_0 ∨  p_924 ∨ break
c  in DIMACS:
-10103 -10104  10105  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 132}_2 ∧ -b^{7, 132}_1 ∧ -b^{7, 132}_0 ∧ true) 
c  in CNF:
c    -b^{7, 132}_2 ∨  b^{7, 132}_1 ∨  b^{7, 132}_0 ∨ false 
c  in DIMACS:
-10103  10104  10105  0

c  3 does not represent an automaton state.
c    -(-b^{7, 132}_2 ∧  b^{7, 132}_1 ∧  b^{7, 132}_0 ∧ true) 
c  in CNF:
c     b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ false 
c  in DIMACS:
 10103 -10104 -10105  0
c  -3 does not represent an automaton state.
c    -( b^{7, 132}_2 ∧  b^{7, 132}_1 ∧  b^{7, 132}_0 ∧ true) 
c  in CNF:
c    -b^{7, 132}_2 ∨ -b^{7, 132}_1 ∨ -b^{7, 132}_0 ∨ false 
c  in DIMACS:
-10103 -10104 -10105  0

c i = 133
c  -2+1 --> -1
c    ( b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧  p_931) -> ( b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0)
c  in CNF:
c    -b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨  b^{7, 134}_2
c    -b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_1
c    -b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨  b^{7, 134}_0
c  in DIMACS:
-10106 -10107  10108 -931  10109 0
-10106 -10107  10108 -931 -10110 0
-10106 -10107  10108 -931  10111 0

c  -1+1 --> 0
c    ( b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0 ∧  p_931) -> (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧ -b^{7, 134}_0)
c  in CNF:
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_2
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_1
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_0
c  in DIMACS:
-10106  10107 -10108 -931 -10109 0
-10106  10107 -10108 -931 -10110 0
-10106  10107 -10108 -931 -10111 0

c  0+1 --> 1
c    (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧  p_931) -> (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0)
c  in CNF:
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_2
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_1
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨  b^{7, 134}_0
c  in DIMACS:
 10106  10107  10108 -931 -10109 0
 10106  10107  10108 -931 -10110 0
 10106  10107  10108 -931  10111 0

c  1+1 --> 2
c    (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0 ∧  p_931) -> (-b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0)
c  in CNF:
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_2
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨  b^{7, 134}_1
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ -p_931 ∨ -b^{7, 134}_0
c  in DIMACS:
 10106  10107 -10108 -931 -10109 0
 10106  10107 -10108 -931  10110 0
 10106  10107 -10108 -931 -10111 0

c  2+1 --> break 
c    (-b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧  p_931) -> break
c  in CNF:
c     b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ -p_931 ∨ break
c  in DIMACS:
 10106 -10107  10108 -931 1162 0


c  2-1 --> 1
c    (-b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧ -p_931) -> (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0)
c  in CNF:
c     b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_2
c     b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_1
c     b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨  b^{7, 134}_0
c  in DIMACS:
 10106 -10107  10108  931 -10109 0
 10106 -10107  10108  931 -10110 0
 10106 -10107  10108  931  10111 0

c  1-1 --> 0
c    (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0 ∧ -p_931) -> (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧ -b^{7, 134}_0)
c  in CNF:
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_2
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_1
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_0
c  in DIMACS:
 10106  10107 -10108  931 -10109 0
 10106  10107 -10108  931 -10110 0
 10106  10107 -10108  931 -10111 0

c  0-1 --> -1
c    (-b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧ -p_931) -> ( b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0)
c  in CNF:
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨  b^{7, 134}_2
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_1
c     b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨  b^{7, 134}_0
c  in DIMACS:
 10106  10107  10108  931  10109 0
 10106  10107  10108  931 -10110 0
 10106  10107  10108  931  10111 0

c  -1-1 --> -2
c    ( b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧  b^{7, 133}_0 ∧ -p_931) -> ( b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0)
c  in CNF:
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨  b^{7, 134}_2
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨  b^{7, 134}_1
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨  p_931 ∨ -b^{7, 134}_0
c  in DIMACS:
-10106  10107 -10108  931  10109 0
-10106  10107 -10108  931  10110 0
-10106  10107 -10108  931 -10111 0

c  -2-1 --> break 
c    ( b^{7, 133}_2 ∧  b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧ -p_931) -> break
c  in CNF:
c    -b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨  b^{7, 133}_0 ∨  p_931 ∨ break
c  in DIMACS:
-10106 -10107  10108  931 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 133}_2 ∧ -b^{7, 133}_1 ∧ -b^{7, 133}_0 ∧ true) 
c  in CNF:
c    -b^{7, 133}_2 ∨  b^{7, 133}_1 ∨  b^{7, 133}_0 ∨ false 
c  in DIMACS:
-10106  10107  10108  0

c  3 does not represent an automaton state.
c    -(-b^{7, 133}_2 ∧  b^{7, 133}_1 ∧  b^{7, 133}_0 ∧ true) 
c  in CNF:
c     b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ false 
c  in DIMACS:
 10106 -10107 -10108  0
c  -3 does not represent an automaton state.
c    -( b^{7, 133}_2 ∧  b^{7, 133}_1 ∧  b^{7, 133}_0 ∧ true) 
c  in CNF:
c    -b^{7, 133}_2 ∨ -b^{7, 133}_1 ∨ -b^{7, 133}_0 ∨ false 
c  in DIMACS:
-10106 -10107 -10108  0

c i = 134
c  -2+1 --> -1
c    ( b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧  p_938) -> ( b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0)
c  in CNF:
c    -b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨  b^{7, 135}_2
c    -b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_1
c    -b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨  b^{7, 135}_0
c  in DIMACS:
-10109 -10110  10111 -938  10112 0
-10109 -10110  10111 -938 -10113 0
-10109 -10110  10111 -938  10114 0

c  -1+1 --> 0
c    ( b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0 ∧  p_938) -> (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧ -b^{7, 135}_0)
c  in CNF:
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_2
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_1
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_0
c  in DIMACS:
-10109  10110 -10111 -938 -10112 0
-10109  10110 -10111 -938 -10113 0
-10109  10110 -10111 -938 -10114 0

c  0+1 --> 1
c    (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧  p_938) -> (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0)
c  in CNF:
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_2
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_1
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨  b^{7, 135}_0
c  in DIMACS:
 10109  10110  10111 -938 -10112 0
 10109  10110  10111 -938 -10113 0
 10109  10110  10111 -938  10114 0

c  1+1 --> 2
c    (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0 ∧  p_938) -> (-b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0)
c  in CNF:
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_2
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨  b^{7, 135}_1
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ -p_938 ∨ -b^{7, 135}_0
c  in DIMACS:
 10109  10110 -10111 -938 -10112 0
 10109  10110 -10111 -938  10113 0
 10109  10110 -10111 -938 -10114 0

c  2+1 --> break 
c    (-b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧  p_938) -> break
c  in CNF:
c     b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 10109 -10110  10111 -938 1162 0


c  2-1 --> 1
c    (-b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧ -p_938) -> (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0)
c  in CNF:
c     b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_2
c     b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_1
c     b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨  b^{7, 135}_0
c  in DIMACS:
 10109 -10110  10111  938 -10112 0
 10109 -10110  10111  938 -10113 0
 10109 -10110  10111  938  10114 0

c  1-1 --> 0
c    (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0 ∧ -p_938) -> (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧ -b^{7, 135}_0)
c  in CNF:
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_2
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_1
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_0
c  in DIMACS:
 10109  10110 -10111  938 -10112 0
 10109  10110 -10111  938 -10113 0
 10109  10110 -10111  938 -10114 0

c  0-1 --> -1
c    (-b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧ -p_938) -> ( b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0)
c  in CNF:
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨  b^{7, 135}_2
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_1
c     b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨  b^{7, 135}_0
c  in DIMACS:
 10109  10110  10111  938  10112 0
 10109  10110  10111  938 -10113 0
 10109  10110  10111  938  10114 0

c  -1-1 --> -2
c    ( b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧  b^{7, 134}_0 ∧ -p_938) -> ( b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0)
c  in CNF:
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨  b^{7, 135}_2
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨  b^{7, 135}_1
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨  p_938 ∨ -b^{7, 135}_0
c  in DIMACS:
-10109  10110 -10111  938  10112 0
-10109  10110 -10111  938  10113 0
-10109  10110 -10111  938 -10114 0

c  -2-1 --> break 
c    ( b^{7, 134}_2 ∧  b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨  b^{7, 134}_0 ∨  p_938 ∨ break
c  in DIMACS:
-10109 -10110  10111  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 134}_2 ∧ -b^{7, 134}_1 ∧ -b^{7, 134}_0 ∧ true) 
c  in CNF:
c    -b^{7, 134}_2 ∨  b^{7, 134}_1 ∨  b^{7, 134}_0 ∨ false 
c  in DIMACS:
-10109  10110  10111  0

c  3 does not represent an automaton state.
c    -(-b^{7, 134}_2 ∧  b^{7, 134}_1 ∧  b^{7, 134}_0 ∧ true) 
c  in CNF:
c     b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ false 
c  in DIMACS:
 10109 -10110 -10111  0
c  -3 does not represent an automaton state.
c    -( b^{7, 134}_2 ∧  b^{7, 134}_1 ∧  b^{7, 134}_0 ∧ true) 
c  in CNF:
c    -b^{7, 134}_2 ∨ -b^{7, 134}_1 ∨ -b^{7, 134}_0 ∨ false 
c  in DIMACS:
-10109 -10110 -10111  0

c i = 135
c  -2+1 --> -1
c    ( b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧  p_945) -> ( b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0)
c  in CNF:
c    -b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨  b^{7, 136}_2
c    -b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_1
c    -b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨  b^{7, 136}_0
c  in DIMACS:
-10112 -10113  10114 -945  10115 0
-10112 -10113  10114 -945 -10116 0
-10112 -10113  10114 -945  10117 0

c  -1+1 --> 0
c    ( b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0 ∧  p_945) -> (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧ -b^{7, 136}_0)
c  in CNF:
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_2
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_1
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_0
c  in DIMACS:
-10112  10113 -10114 -945 -10115 0
-10112  10113 -10114 -945 -10116 0
-10112  10113 -10114 -945 -10117 0

c  0+1 --> 1
c    (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧  p_945) -> (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0)
c  in CNF:
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_2
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_1
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨  b^{7, 136}_0
c  in DIMACS:
 10112  10113  10114 -945 -10115 0
 10112  10113  10114 -945 -10116 0
 10112  10113  10114 -945  10117 0

c  1+1 --> 2
c    (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0 ∧  p_945) -> (-b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0)
c  in CNF:
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_2
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨  b^{7, 136}_1
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ -p_945 ∨ -b^{7, 136}_0
c  in DIMACS:
 10112  10113 -10114 -945 -10115 0
 10112  10113 -10114 -945  10116 0
 10112  10113 -10114 -945 -10117 0

c  2+1 --> break 
c    (-b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧  p_945) -> break
c  in CNF:
c     b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 10112 -10113  10114 -945 1162 0


c  2-1 --> 1
c    (-b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧ -p_945) -> (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0)
c  in CNF:
c     b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_2
c     b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_1
c     b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨  b^{7, 136}_0
c  in DIMACS:
 10112 -10113  10114  945 -10115 0
 10112 -10113  10114  945 -10116 0
 10112 -10113  10114  945  10117 0

c  1-1 --> 0
c    (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0 ∧ -p_945) -> (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧ -b^{7, 136}_0)
c  in CNF:
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_2
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_1
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_0
c  in DIMACS:
 10112  10113 -10114  945 -10115 0
 10112  10113 -10114  945 -10116 0
 10112  10113 -10114  945 -10117 0

c  0-1 --> -1
c    (-b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧ -p_945) -> ( b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0)
c  in CNF:
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨  b^{7, 136}_2
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_1
c     b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨  b^{7, 136}_0
c  in DIMACS:
 10112  10113  10114  945  10115 0
 10112  10113  10114  945 -10116 0
 10112  10113  10114  945  10117 0

c  -1-1 --> -2
c    ( b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧  b^{7, 135}_0 ∧ -p_945) -> ( b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0)
c  in CNF:
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨  b^{7, 136}_2
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨  b^{7, 136}_1
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨  p_945 ∨ -b^{7, 136}_0
c  in DIMACS:
-10112  10113 -10114  945  10115 0
-10112  10113 -10114  945  10116 0
-10112  10113 -10114  945 -10117 0

c  -2-1 --> break 
c    ( b^{7, 135}_2 ∧  b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨  b^{7, 135}_0 ∨  p_945 ∨ break
c  in DIMACS:
-10112 -10113  10114  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 135}_2 ∧ -b^{7, 135}_1 ∧ -b^{7, 135}_0 ∧ true) 
c  in CNF:
c    -b^{7, 135}_2 ∨  b^{7, 135}_1 ∨  b^{7, 135}_0 ∨ false 
c  in DIMACS:
-10112  10113  10114  0

c  3 does not represent an automaton state.
c    -(-b^{7, 135}_2 ∧  b^{7, 135}_1 ∧  b^{7, 135}_0 ∧ true) 
c  in CNF:
c     b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ false 
c  in DIMACS:
 10112 -10113 -10114  0
c  -3 does not represent an automaton state.
c    -( b^{7, 135}_2 ∧  b^{7, 135}_1 ∧  b^{7, 135}_0 ∧ true) 
c  in CNF:
c    -b^{7, 135}_2 ∨ -b^{7, 135}_1 ∨ -b^{7, 135}_0 ∨ false 
c  in DIMACS:
-10112 -10113 -10114  0

c i = 136
c  -2+1 --> -1
c    ( b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧  p_952) -> ( b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0)
c  in CNF:
c    -b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨  b^{7, 137}_2
c    -b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_1
c    -b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨  b^{7, 137}_0
c  in DIMACS:
-10115 -10116  10117 -952  10118 0
-10115 -10116  10117 -952 -10119 0
-10115 -10116  10117 -952  10120 0

c  -1+1 --> 0
c    ( b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0 ∧  p_952) -> (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧ -b^{7, 137}_0)
c  in CNF:
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_2
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_1
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_0
c  in DIMACS:
-10115  10116 -10117 -952 -10118 0
-10115  10116 -10117 -952 -10119 0
-10115  10116 -10117 -952 -10120 0

c  0+1 --> 1
c    (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧  p_952) -> (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0)
c  in CNF:
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_2
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_1
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨  b^{7, 137}_0
c  in DIMACS:
 10115  10116  10117 -952 -10118 0
 10115  10116  10117 -952 -10119 0
 10115  10116  10117 -952  10120 0

c  1+1 --> 2
c    (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0 ∧  p_952) -> (-b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0)
c  in CNF:
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_2
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨  b^{7, 137}_1
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ -p_952 ∨ -b^{7, 137}_0
c  in DIMACS:
 10115  10116 -10117 -952 -10118 0
 10115  10116 -10117 -952  10119 0
 10115  10116 -10117 -952 -10120 0

c  2+1 --> break 
c    (-b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧  p_952) -> break
c  in CNF:
c     b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 10115 -10116  10117 -952 1162 0


c  2-1 --> 1
c    (-b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧ -p_952) -> (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0)
c  in CNF:
c     b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_2
c     b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_1
c     b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨  b^{7, 137}_0
c  in DIMACS:
 10115 -10116  10117  952 -10118 0
 10115 -10116  10117  952 -10119 0
 10115 -10116  10117  952  10120 0

c  1-1 --> 0
c    (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0 ∧ -p_952) -> (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧ -b^{7, 137}_0)
c  in CNF:
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_2
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_1
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_0
c  in DIMACS:
 10115  10116 -10117  952 -10118 0
 10115  10116 -10117  952 -10119 0
 10115  10116 -10117  952 -10120 0

c  0-1 --> -1
c    (-b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧ -p_952) -> ( b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0)
c  in CNF:
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨  b^{7, 137}_2
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_1
c     b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨  b^{7, 137}_0
c  in DIMACS:
 10115  10116  10117  952  10118 0
 10115  10116  10117  952 -10119 0
 10115  10116  10117  952  10120 0

c  -1-1 --> -2
c    ( b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧  b^{7, 136}_0 ∧ -p_952) -> ( b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0)
c  in CNF:
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨  b^{7, 137}_2
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨  b^{7, 137}_1
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨  p_952 ∨ -b^{7, 137}_0
c  in DIMACS:
-10115  10116 -10117  952  10118 0
-10115  10116 -10117  952  10119 0
-10115  10116 -10117  952 -10120 0

c  -2-1 --> break 
c    ( b^{7, 136}_2 ∧  b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨  b^{7, 136}_0 ∨  p_952 ∨ break
c  in DIMACS:
-10115 -10116  10117  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 136}_2 ∧ -b^{7, 136}_1 ∧ -b^{7, 136}_0 ∧ true) 
c  in CNF:
c    -b^{7, 136}_2 ∨  b^{7, 136}_1 ∨  b^{7, 136}_0 ∨ false 
c  in DIMACS:
-10115  10116  10117  0

c  3 does not represent an automaton state.
c    -(-b^{7, 136}_2 ∧  b^{7, 136}_1 ∧  b^{7, 136}_0 ∧ true) 
c  in CNF:
c     b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ false 
c  in DIMACS:
 10115 -10116 -10117  0
c  -3 does not represent an automaton state.
c    -( b^{7, 136}_2 ∧  b^{7, 136}_1 ∧  b^{7, 136}_0 ∧ true) 
c  in CNF:
c    -b^{7, 136}_2 ∨ -b^{7, 136}_1 ∨ -b^{7, 136}_0 ∨ false 
c  in DIMACS:
-10115 -10116 -10117  0

c i = 137
c  -2+1 --> -1
c    ( b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧  p_959) -> ( b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0)
c  in CNF:
c    -b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨  b^{7, 138}_2
c    -b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_1
c    -b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨  b^{7, 138}_0
c  in DIMACS:
-10118 -10119  10120 -959  10121 0
-10118 -10119  10120 -959 -10122 0
-10118 -10119  10120 -959  10123 0

c  -1+1 --> 0
c    ( b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0 ∧  p_959) -> (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧ -b^{7, 138}_0)
c  in CNF:
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_2
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_1
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_0
c  in DIMACS:
-10118  10119 -10120 -959 -10121 0
-10118  10119 -10120 -959 -10122 0
-10118  10119 -10120 -959 -10123 0

c  0+1 --> 1
c    (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧  p_959) -> (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0)
c  in CNF:
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_2
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_1
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨  b^{7, 138}_0
c  in DIMACS:
 10118  10119  10120 -959 -10121 0
 10118  10119  10120 -959 -10122 0
 10118  10119  10120 -959  10123 0

c  1+1 --> 2
c    (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0 ∧  p_959) -> (-b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0)
c  in CNF:
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_2
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨  b^{7, 138}_1
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ -p_959 ∨ -b^{7, 138}_0
c  in DIMACS:
 10118  10119 -10120 -959 -10121 0
 10118  10119 -10120 -959  10122 0
 10118  10119 -10120 -959 -10123 0

c  2+1 --> break 
c    (-b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧  p_959) -> break
c  in CNF:
c     b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ -p_959 ∨ break
c  in DIMACS:
 10118 -10119  10120 -959 1162 0


c  2-1 --> 1
c    (-b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧ -p_959) -> (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0)
c  in CNF:
c     b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_2
c     b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_1
c     b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨  b^{7, 138}_0
c  in DIMACS:
 10118 -10119  10120  959 -10121 0
 10118 -10119  10120  959 -10122 0
 10118 -10119  10120  959  10123 0

c  1-1 --> 0
c    (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0 ∧ -p_959) -> (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧ -b^{7, 138}_0)
c  in CNF:
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_2
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_1
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_0
c  in DIMACS:
 10118  10119 -10120  959 -10121 0
 10118  10119 -10120  959 -10122 0
 10118  10119 -10120  959 -10123 0

c  0-1 --> -1
c    (-b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧ -p_959) -> ( b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0)
c  in CNF:
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨  b^{7, 138}_2
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_1
c     b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨  b^{7, 138}_0
c  in DIMACS:
 10118  10119  10120  959  10121 0
 10118  10119  10120  959 -10122 0
 10118  10119  10120  959  10123 0

c  -1-1 --> -2
c    ( b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧  b^{7, 137}_0 ∧ -p_959) -> ( b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0)
c  in CNF:
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨  b^{7, 138}_2
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨  b^{7, 138}_1
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨  p_959 ∨ -b^{7, 138}_0
c  in DIMACS:
-10118  10119 -10120  959  10121 0
-10118  10119 -10120  959  10122 0
-10118  10119 -10120  959 -10123 0

c  -2-1 --> break 
c    ( b^{7, 137}_2 ∧  b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧ -p_959) -> break
c  in CNF:
c    -b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨  b^{7, 137}_0 ∨  p_959 ∨ break
c  in DIMACS:
-10118 -10119  10120  959 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 137}_2 ∧ -b^{7, 137}_1 ∧ -b^{7, 137}_0 ∧ true) 
c  in CNF:
c    -b^{7, 137}_2 ∨  b^{7, 137}_1 ∨  b^{7, 137}_0 ∨ false 
c  in DIMACS:
-10118  10119  10120  0

c  3 does not represent an automaton state.
c    -(-b^{7, 137}_2 ∧  b^{7, 137}_1 ∧  b^{7, 137}_0 ∧ true) 
c  in CNF:
c     b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ false 
c  in DIMACS:
 10118 -10119 -10120  0
c  -3 does not represent an automaton state.
c    -( b^{7, 137}_2 ∧  b^{7, 137}_1 ∧  b^{7, 137}_0 ∧ true) 
c  in CNF:
c    -b^{7, 137}_2 ∨ -b^{7, 137}_1 ∨ -b^{7, 137}_0 ∨ false 
c  in DIMACS:
-10118 -10119 -10120  0

c i = 138
c  -2+1 --> -1
c    ( b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧  p_966) -> ( b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0)
c  in CNF:
c    -b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨  b^{7, 139}_2
c    -b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_1
c    -b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨  b^{7, 139}_0
c  in DIMACS:
-10121 -10122  10123 -966  10124 0
-10121 -10122  10123 -966 -10125 0
-10121 -10122  10123 -966  10126 0

c  -1+1 --> 0
c    ( b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0 ∧  p_966) -> (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧ -b^{7, 139}_0)
c  in CNF:
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_2
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_1
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_0
c  in DIMACS:
-10121  10122 -10123 -966 -10124 0
-10121  10122 -10123 -966 -10125 0
-10121  10122 -10123 -966 -10126 0

c  0+1 --> 1
c    (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧  p_966) -> (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0)
c  in CNF:
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_2
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_1
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨  b^{7, 139}_0
c  in DIMACS:
 10121  10122  10123 -966 -10124 0
 10121  10122  10123 -966 -10125 0
 10121  10122  10123 -966  10126 0

c  1+1 --> 2
c    (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0 ∧  p_966) -> (-b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0)
c  in CNF:
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_2
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨  b^{7, 139}_1
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ -p_966 ∨ -b^{7, 139}_0
c  in DIMACS:
 10121  10122 -10123 -966 -10124 0
 10121  10122 -10123 -966  10125 0
 10121  10122 -10123 -966 -10126 0

c  2+1 --> break 
c    (-b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧  p_966) -> break
c  in CNF:
c     b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 10121 -10122  10123 -966 1162 0


c  2-1 --> 1
c    (-b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧ -p_966) -> (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0)
c  in CNF:
c     b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_2
c     b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_1
c     b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨  b^{7, 139}_0
c  in DIMACS:
 10121 -10122  10123  966 -10124 0
 10121 -10122  10123  966 -10125 0
 10121 -10122  10123  966  10126 0

c  1-1 --> 0
c    (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0 ∧ -p_966) -> (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧ -b^{7, 139}_0)
c  in CNF:
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_2
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_1
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_0
c  in DIMACS:
 10121  10122 -10123  966 -10124 0
 10121  10122 -10123  966 -10125 0
 10121  10122 -10123  966 -10126 0

c  0-1 --> -1
c    (-b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧ -p_966) -> ( b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0)
c  in CNF:
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨  b^{7, 139}_2
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_1
c     b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨  b^{7, 139}_0
c  in DIMACS:
 10121  10122  10123  966  10124 0
 10121  10122  10123  966 -10125 0
 10121  10122  10123  966  10126 0

c  -1-1 --> -2
c    ( b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧  b^{7, 138}_0 ∧ -p_966) -> ( b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0)
c  in CNF:
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨  b^{7, 139}_2
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨  b^{7, 139}_1
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨  p_966 ∨ -b^{7, 139}_0
c  in DIMACS:
-10121  10122 -10123  966  10124 0
-10121  10122 -10123  966  10125 0
-10121  10122 -10123  966 -10126 0

c  -2-1 --> break 
c    ( b^{7, 138}_2 ∧  b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨  b^{7, 138}_0 ∨  p_966 ∨ break
c  in DIMACS:
-10121 -10122  10123  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 138}_2 ∧ -b^{7, 138}_1 ∧ -b^{7, 138}_0 ∧ true) 
c  in CNF:
c    -b^{7, 138}_2 ∨  b^{7, 138}_1 ∨  b^{7, 138}_0 ∨ false 
c  in DIMACS:
-10121  10122  10123  0

c  3 does not represent an automaton state.
c    -(-b^{7, 138}_2 ∧  b^{7, 138}_1 ∧  b^{7, 138}_0 ∧ true) 
c  in CNF:
c     b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ false 
c  in DIMACS:
 10121 -10122 -10123  0
c  -3 does not represent an automaton state.
c    -( b^{7, 138}_2 ∧  b^{7, 138}_1 ∧  b^{7, 138}_0 ∧ true) 
c  in CNF:
c    -b^{7, 138}_2 ∨ -b^{7, 138}_1 ∨ -b^{7, 138}_0 ∨ false 
c  in DIMACS:
-10121 -10122 -10123  0

c i = 139
c  -2+1 --> -1
c    ( b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧  p_973) -> ( b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0)
c  in CNF:
c    -b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨  b^{7, 140}_2
c    -b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_1
c    -b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨  b^{7, 140}_0
c  in DIMACS:
-10124 -10125  10126 -973  10127 0
-10124 -10125  10126 -973 -10128 0
-10124 -10125  10126 -973  10129 0

c  -1+1 --> 0
c    ( b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0 ∧  p_973) -> (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧ -b^{7, 140}_0)
c  in CNF:
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_2
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_1
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_0
c  in DIMACS:
-10124  10125 -10126 -973 -10127 0
-10124  10125 -10126 -973 -10128 0
-10124  10125 -10126 -973 -10129 0

c  0+1 --> 1
c    (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧  p_973) -> (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0)
c  in CNF:
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_2
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_1
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨  b^{7, 140}_0
c  in DIMACS:
 10124  10125  10126 -973 -10127 0
 10124  10125  10126 -973 -10128 0
 10124  10125  10126 -973  10129 0

c  1+1 --> 2
c    (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0 ∧  p_973) -> (-b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0)
c  in CNF:
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_2
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨  b^{7, 140}_1
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ -p_973 ∨ -b^{7, 140}_0
c  in DIMACS:
 10124  10125 -10126 -973 -10127 0
 10124  10125 -10126 -973  10128 0
 10124  10125 -10126 -973 -10129 0

c  2+1 --> break 
c    (-b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧  p_973) -> break
c  in CNF:
c     b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ -p_973 ∨ break
c  in DIMACS:
 10124 -10125  10126 -973 1162 0


c  2-1 --> 1
c    (-b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧ -p_973) -> (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0)
c  in CNF:
c     b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_2
c     b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_1
c     b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨  b^{7, 140}_0
c  in DIMACS:
 10124 -10125  10126  973 -10127 0
 10124 -10125  10126  973 -10128 0
 10124 -10125  10126  973  10129 0

c  1-1 --> 0
c    (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0 ∧ -p_973) -> (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧ -b^{7, 140}_0)
c  in CNF:
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_2
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_1
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_0
c  in DIMACS:
 10124  10125 -10126  973 -10127 0
 10124  10125 -10126  973 -10128 0
 10124  10125 -10126  973 -10129 0

c  0-1 --> -1
c    (-b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧ -p_973) -> ( b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0)
c  in CNF:
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨  b^{7, 140}_2
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_1
c     b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨  b^{7, 140}_0
c  in DIMACS:
 10124  10125  10126  973  10127 0
 10124  10125  10126  973 -10128 0
 10124  10125  10126  973  10129 0

c  -1-1 --> -2
c    ( b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧  b^{7, 139}_0 ∧ -p_973) -> ( b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0)
c  in CNF:
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨  b^{7, 140}_2
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨  b^{7, 140}_1
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨  p_973 ∨ -b^{7, 140}_0
c  in DIMACS:
-10124  10125 -10126  973  10127 0
-10124  10125 -10126  973  10128 0
-10124  10125 -10126  973 -10129 0

c  -2-1 --> break 
c    ( b^{7, 139}_2 ∧  b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧ -p_973) -> break
c  in CNF:
c    -b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨  b^{7, 139}_0 ∨  p_973 ∨ break
c  in DIMACS:
-10124 -10125  10126  973 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 139}_2 ∧ -b^{7, 139}_1 ∧ -b^{7, 139}_0 ∧ true) 
c  in CNF:
c    -b^{7, 139}_2 ∨  b^{7, 139}_1 ∨  b^{7, 139}_0 ∨ false 
c  in DIMACS:
-10124  10125  10126  0

c  3 does not represent an automaton state.
c    -(-b^{7, 139}_2 ∧  b^{7, 139}_1 ∧  b^{7, 139}_0 ∧ true) 
c  in CNF:
c     b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ false 
c  in DIMACS:
 10124 -10125 -10126  0
c  -3 does not represent an automaton state.
c    -( b^{7, 139}_2 ∧  b^{7, 139}_1 ∧  b^{7, 139}_0 ∧ true) 
c  in CNF:
c    -b^{7, 139}_2 ∨ -b^{7, 139}_1 ∨ -b^{7, 139}_0 ∨ false 
c  in DIMACS:
-10124 -10125 -10126  0

c i = 140
c  -2+1 --> -1
c    ( b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧  p_980) -> ( b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0)
c  in CNF:
c    -b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨  b^{7, 141}_2
c    -b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_1
c    -b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨  b^{7, 141}_0
c  in DIMACS:
-10127 -10128  10129 -980  10130 0
-10127 -10128  10129 -980 -10131 0
-10127 -10128  10129 -980  10132 0

c  -1+1 --> 0
c    ( b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0 ∧  p_980) -> (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧ -b^{7, 141}_0)
c  in CNF:
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_2
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_1
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_0
c  in DIMACS:
-10127  10128 -10129 -980 -10130 0
-10127  10128 -10129 -980 -10131 0
-10127  10128 -10129 -980 -10132 0

c  0+1 --> 1
c    (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧  p_980) -> (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0)
c  in CNF:
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_2
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_1
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨  b^{7, 141}_0
c  in DIMACS:
 10127  10128  10129 -980 -10130 0
 10127  10128  10129 -980 -10131 0
 10127  10128  10129 -980  10132 0

c  1+1 --> 2
c    (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0 ∧  p_980) -> (-b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0)
c  in CNF:
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_2
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨  b^{7, 141}_1
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ -p_980 ∨ -b^{7, 141}_0
c  in DIMACS:
 10127  10128 -10129 -980 -10130 0
 10127  10128 -10129 -980  10131 0
 10127  10128 -10129 -980 -10132 0

c  2+1 --> break 
c    (-b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧  p_980) -> break
c  in CNF:
c     b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 10127 -10128  10129 -980 1162 0


c  2-1 --> 1
c    (-b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧ -p_980) -> (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0)
c  in CNF:
c     b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_2
c     b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_1
c     b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨  b^{7, 141}_0
c  in DIMACS:
 10127 -10128  10129  980 -10130 0
 10127 -10128  10129  980 -10131 0
 10127 -10128  10129  980  10132 0

c  1-1 --> 0
c    (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0 ∧ -p_980) -> (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧ -b^{7, 141}_0)
c  in CNF:
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_2
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_1
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_0
c  in DIMACS:
 10127  10128 -10129  980 -10130 0
 10127  10128 -10129  980 -10131 0
 10127  10128 -10129  980 -10132 0

c  0-1 --> -1
c    (-b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧ -p_980) -> ( b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0)
c  in CNF:
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨  b^{7, 141}_2
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_1
c     b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨  b^{7, 141}_0
c  in DIMACS:
 10127  10128  10129  980  10130 0
 10127  10128  10129  980 -10131 0
 10127  10128  10129  980  10132 0

c  -1-1 --> -2
c    ( b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧  b^{7, 140}_0 ∧ -p_980) -> ( b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0)
c  in CNF:
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨  b^{7, 141}_2
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨  b^{7, 141}_1
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨  p_980 ∨ -b^{7, 141}_0
c  in DIMACS:
-10127  10128 -10129  980  10130 0
-10127  10128 -10129  980  10131 0
-10127  10128 -10129  980 -10132 0

c  -2-1 --> break 
c    ( b^{7, 140}_2 ∧  b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨  b^{7, 140}_0 ∨  p_980 ∨ break
c  in DIMACS:
-10127 -10128  10129  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 140}_2 ∧ -b^{7, 140}_1 ∧ -b^{7, 140}_0 ∧ true) 
c  in CNF:
c    -b^{7, 140}_2 ∨  b^{7, 140}_1 ∨  b^{7, 140}_0 ∨ false 
c  in DIMACS:
-10127  10128  10129  0

c  3 does not represent an automaton state.
c    -(-b^{7, 140}_2 ∧  b^{7, 140}_1 ∧  b^{7, 140}_0 ∧ true) 
c  in CNF:
c     b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ false 
c  in DIMACS:
 10127 -10128 -10129  0
c  -3 does not represent an automaton state.
c    -( b^{7, 140}_2 ∧  b^{7, 140}_1 ∧  b^{7, 140}_0 ∧ true) 
c  in CNF:
c    -b^{7, 140}_2 ∨ -b^{7, 140}_1 ∨ -b^{7, 140}_0 ∨ false 
c  in DIMACS:
-10127 -10128 -10129  0

c i = 141
c  -2+1 --> -1
c    ( b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧  p_987) -> ( b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0)
c  in CNF:
c    -b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨  b^{7, 142}_2
c    -b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_1
c    -b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨  b^{7, 142}_0
c  in DIMACS:
-10130 -10131  10132 -987  10133 0
-10130 -10131  10132 -987 -10134 0
-10130 -10131  10132 -987  10135 0

c  -1+1 --> 0
c    ( b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0 ∧  p_987) -> (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧ -b^{7, 142}_0)
c  in CNF:
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_2
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_1
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_0
c  in DIMACS:
-10130  10131 -10132 -987 -10133 0
-10130  10131 -10132 -987 -10134 0
-10130  10131 -10132 -987 -10135 0

c  0+1 --> 1
c    (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧  p_987) -> (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0)
c  in CNF:
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_2
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_1
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨  b^{7, 142}_0
c  in DIMACS:
 10130  10131  10132 -987 -10133 0
 10130  10131  10132 -987 -10134 0
 10130  10131  10132 -987  10135 0

c  1+1 --> 2
c    (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0 ∧  p_987) -> (-b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0)
c  in CNF:
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_2
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨  b^{7, 142}_1
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ -p_987 ∨ -b^{7, 142}_0
c  in DIMACS:
 10130  10131 -10132 -987 -10133 0
 10130  10131 -10132 -987  10134 0
 10130  10131 -10132 -987 -10135 0

c  2+1 --> break 
c    (-b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧  p_987) -> break
c  in CNF:
c     b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 10130 -10131  10132 -987 1162 0


c  2-1 --> 1
c    (-b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧ -p_987) -> (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0)
c  in CNF:
c     b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_2
c     b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_1
c     b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨  b^{7, 142}_0
c  in DIMACS:
 10130 -10131  10132  987 -10133 0
 10130 -10131  10132  987 -10134 0
 10130 -10131  10132  987  10135 0

c  1-1 --> 0
c    (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0 ∧ -p_987) -> (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧ -b^{7, 142}_0)
c  in CNF:
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_2
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_1
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_0
c  in DIMACS:
 10130  10131 -10132  987 -10133 0
 10130  10131 -10132  987 -10134 0
 10130  10131 -10132  987 -10135 0

c  0-1 --> -1
c    (-b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧ -p_987) -> ( b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0)
c  in CNF:
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨  b^{7, 142}_2
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_1
c     b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨  b^{7, 142}_0
c  in DIMACS:
 10130  10131  10132  987  10133 0
 10130  10131  10132  987 -10134 0
 10130  10131  10132  987  10135 0

c  -1-1 --> -2
c    ( b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧  b^{7, 141}_0 ∧ -p_987) -> ( b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0)
c  in CNF:
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨  b^{7, 142}_2
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨  b^{7, 142}_1
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨  p_987 ∨ -b^{7, 142}_0
c  in DIMACS:
-10130  10131 -10132  987  10133 0
-10130  10131 -10132  987  10134 0
-10130  10131 -10132  987 -10135 0

c  -2-1 --> break 
c    ( b^{7, 141}_2 ∧  b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨  b^{7, 141}_0 ∨  p_987 ∨ break
c  in DIMACS:
-10130 -10131  10132  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 141}_2 ∧ -b^{7, 141}_1 ∧ -b^{7, 141}_0 ∧ true) 
c  in CNF:
c    -b^{7, 141}_2 ∨  b^{7, 141}_1 ∨  b^{7, 141}_0 ∨ false 
c  in DIMACS:
-10130  10131  10132  0

c  3 does not represent an automaton state.
c    -(-b^{7, 141}_2 ∧  b^{7, 141}_1 ∧  b^{7, 141}_0 ∧ true) 
c  in CNF:
c     b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ false 
c  in DIMACS:
 10130 -10131 -10132  0
c  -3 does not represent an automaton state.
c    -( b^{7, 141}_2 ∧  b^{7, 141}_1 ∧  b^{7, 141}_0 ∧ true) 
c  in CNF:
c    -b^{7, 141}_2 ∨ -b^{7, 141}_1 ∨ -b^{7, 141}_0 ∨ false 
c  in DIMACS:
-10130 -10131 -10132  0

c i = 142
c  -2+1 --> -1
c    ( b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧  p_994) -> ( b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0)
c  in CNF:
c    -b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨  b^{7, 143}_2
c    -b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_1
c    -b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨  b^{7, 143}_0
c  in DIMACS:
-10133 -10134  10135 -994  10136 0
-10133 -10134  10135 -994 -10137 0
-10133 -10134  10135 -994  10138 0

c  -1+1 --> 0
c    ( b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0 ∧  p_994) -> (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧ -b^{7, 143}_0)
c  in CNF:
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_2
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_1
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_0
c  in DIMACS:
-10133  10134 -10135 -994 -10136 0
-10133  10134 -10135 -994 -10137 0
-10133  10134 -10135 -994 -10138 0

c  0+1 --> 1
c    (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧  p_994) -> (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0)
c  in CNF:
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_2
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_1
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨  b^{7, 143}_0
c  in DIMACS:
 10133  10134  10135 -994 -10136 0
 10133  10134  10135 -994 -10137 0
 10133  10134  10135 -994  10138 0

c  1+1 --> 2
c    (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0 ∧  p_994) -> (-b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0)
c  in CNF:
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_2
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨  b^{7, 143}_1
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ -p_994 ∨ -b^{7, 143}_0
c  in DIMACS:
 10133  10134 -10135 -994 -10136 0
 10133  10134 -10135 -994  10137 0
 10133  10134 -10135 -994 -10138 0

c  2+1 --> break 
c    (-b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧  p_994) -> break
c  in CNF:
c     b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 10133 -10134  10135 -994 1162 0


c  2-1 --> 1
c    (-b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧ -p_994) -> (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0)
c  in CNF:
c     b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_2
c     b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_1
c     b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨  b^{7, 143}_0
c  in DIMACS:
 10133 -10134  10135  994 -10136 0
 10133 -10134  10135  994 -10137 0
 10133 -10134  10135  994  10138 0

c  1-1 --> 0
c    (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0 ∧ -p_994) -> (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧ -b^{7, 143}_0)
c  in CNF:
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_2
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_1
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_0
c  in DIMACS:
 10133  10134 -10135  994 -10136 0
 10133  10134 -10135  994 -10137 0
 10133  10134 -10135  994 -10138 0

c  0-1 --> -1
c    (-b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧ -p_994) -> ( b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0)
c  in CNF:
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨  b^{7, 143}_2
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_1
c     b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨  b^{7, 143}_0
c  in DIMACS:
 10133  10134  10135  994  10136 0
 10133  10134  10135  994 -10137 0
 10133  10134  10135  994  10138 0

c  -1-1 --> -2
c    ( b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧  b^{7, 142}_0 ∧ -p_994) -> ( b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0)
c  in CNF:
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨  b^{7, 143}_2
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨  b^{7, 143}_1
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨  p_994 ∨ -b^{7, 143}_0
c  in DIMACS:
-10133  10134 -10135  994  10136 0
-10133  10134 -10135  994  10137 0
-10133  10134 -10135  994 -10138 0

c  -2-1 --> break 
c    ( b^{7, 142}_2 ∧  b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨  b^{7, 142}_0 ∨  p_994 ∨ break
c  in DIMACS:
-10133 -10134  10135  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 142}_2 ∧ -b^{7, 142}_1 ∧ -b^{7, 142}_0 ∧ true) 
c  in CNF:
c    -b^{7, 142}_2 ∨  b^{7, 142}_1 ∨  b^{7, 142}_0 ∨ false 
c  in DIMACS:
-10133  10134  10135  0

c  3 does not represent an automaton state.
c    -(-b^{7, 142}_2 ∧  b^{7, 142}_1 ∧  b^{7, 142}_0 ∧ true) 
c  in CNF:
c     b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ false 
c  in DIMACS:
 10133 -10134 -10135  0
c  -3 does not represent an automaton state.
c    -( b^{7, 142}_2 ∧  b^{7, 142}_1 ∧  b^{7, 142}_0 ∧ true) 
c  in CNF:
c    -b^{7, 142}_2 ∨ -b^{7, 142}_1 ∨ -b^{7, 142}_0 ∨ false 
c  in DIMACS:
-10133 -10134 -10135  0

c i = 143
c  -2+1 --> -1
c    ( b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧  p_1001) -> ( b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0)
c  in CNF:
c    -b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨  b^{7, 144}_2
c    -b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_1
c    -b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨  b^{7, 144}_0
c  in DIMACS:
-10136 -10137  10138 -1001  10139 0
-10136 -10137  10138 -1001 -10140 0
-10136 -10137  10138 -1001  10141 0

c  -1+1 --> 0
c    ( b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0 ∧  p_1001) -> (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧ -b^{7, 144}_0)
c  in CNF:
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_2
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_1
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_0
c  in DIMACS:
-10136  10137 -10138 -1001 -10139 0
-10136  10137 -10138 -1001 -10140 0
-10136  10137 -10138 -1001 -10141 0

c  0+1 --> 1
c    (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧  p_1001) -> (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0)
c  in CNF:
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_2
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_1
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨  b^{7, 144}_0
c  in DIMACS:
 10136  10137  10138 -1001 -10139 0
 10136  10137  10138 -1001 -10140 0
 10136  10137  10138 -1001  10141 0

c  1+1 --> 2
c    (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0 ∧  p_1001) -> (-b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0)
c  in CNF:
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_2
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨  b^{7, 144}_1
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ -p_1001 ∨ -b^{7, 144}_0
c  in DIMACS:
 10136  10137 -10138 -1001 -10139 0
 10136  10137 -10138 -1001  10140 0
 10136  10137 -10138 -1001 -10141 0

c  2+1 --> break 
c    (-b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 10136 -10137  10138 -1001 1162 0


c  2-1 --> 1
c    (-b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧ -p_1001) -> (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0)
c  in CNF:
c     b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_2
c     b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_1
c     b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨  b^{7, 144}_0
c  in DIMACS:
 10136 -10137  10138  1001 -10139 0
 10136 -10137  10138  1001 -10140 0
 10136 -10137  10138  1001  10141 0

c  1-1 --> 0
c    (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0 ∧ -p_1001) -> (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧ -b^{7, 144}_0)
c  in CNF:
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_2
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_1
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_0
c  in DIMACS:
 10136  10137 -10138  1001 -10139 0
 10136  10137 -10138  1001 -10140 0
 10136  10137 -10138  1001 -10141 0

c  0-1 --> -1
c    (-b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧ -p_1001) -> ( b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0)
c  in CNF:
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨  b^{7, 144}_2
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_1
c     b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨  b^{7, 144}_0
c  in DIMACS:
 10136  10137  10138  1001  10139 0
 10136  10137  10138  1001 -10140 0
 10136  10137  10138  1001  10141 0

c  -1-1 --> -2
c    ( b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧  b^{7, 143}_0 ∧ -p_1001) -> ( b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0)
c  in CNF:
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨  b^{7, 144}_2
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨  b^{7, 144}_1
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨  p_1001 ∨ -b^{7, 144}_0
c  in DIMACS:
-10136  10137 -10138  1001  10139 0
-10136  10137 -10138  1001  10140 0
-10136  10137 -10138  1001 -10141 0

c  -2-1 --> break 
c    ( b^{7, 143}_2 ∧  b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨  b^{7, 143}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-10136 -10137  10138  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 143}_2 ∧ -b^{7, 143}_1 ∧ -b^{7, 143}_0 ∧ true) 
c  in CNF:
c    -b^{7, 143}_2 ∨  b^{7, 143}_1 ∨  b^{7, 143}_0 ∨ false 
c  in DIMACS:
-10136  10137  10138  0

c  3 does not represent an automaton state.
c    -(-b^{7, 143}_2 ∧  b^{7, 143}_1 ∧  b^{7, 143}_0 ∧ true) 
c  in CNF:
c     b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ false 
c  in DIMACS:
 10136 -10137 -10138  0
c  -3 does not represent an automaton state.
c    -( b^{7, 143}_2 ∧  b^{7, 143}_1 ∧  b^{7, 143}_0 ∧ true) 
c  in CNF:
c    -b^{7, 143}_2 ∨ -b^{7, 143}_1 ∨ -b^{7, 143}_0 ∨ false 
c  in DIMACS:
-10136 -10137 -10138  0

c i = 144
c  -2+1 --> -1
c    ( b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧  p_1008) -> ( b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0)
c  in CNF:
c    -b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨  b^{7, 145}_2
c    -b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_1
c    -b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨  b^{7, 145}_0
c  in DIMACS:
-10139 -10140  10141 -1008  10142 0
-10139 -10140  10141 -1008 -10143 0
-10139 -10140  10141 -1008  10144 0

c  -1+1 --> 0
c    ( b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0 ∧  p_1008) -> (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧ -b^{7, 145}_0)
c  in CNF:
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_2
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_1
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_0
c  in DIMACS:
-10139  10140 -10141 -1008 -10142 0
-10139  10140 -10141 -1008 -10143 0
-10139  10140 -10141 -1008 -10144 0

c  0+1 --> 1
c    (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧  p_1008) -> (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0)
c  in CNF:
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_2
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_1
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨  b^{7, 145}_0
c  in DIMACS:
 10139  10140  10141 -1008 -10142 0
 10139  10140  10141 -1008 -10143 0
 10139  10140  10141 -1008  10144 0

c  1+1 --> 2
c    (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0 ∧  p_1008) -> (-b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0)
c  in CNF:
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_2
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨  b^{7, 145}_1
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ -p_1008 ∨ -b^{7, 145}_0
c  in DIMACS:
 10139  10140 -10141 -1008 -10142 0
 10139  10140 -10141 -1008  10143 0
 10139  10140 -10141 -1008 -10144 0

c  2+1 --> break 
c    (-b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 10139 -10140  10141 -1008 1162 0


c  2-1 --> 1
c    (-b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧ -p_1008) -> (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0)
c  in CNF:
c     b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_2
c     b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_1
c     b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨  b^{7, 145}_0
c  in DIMACS:
 10139 -10140  10141  1008 -10142 0
 10139 -10140  10141  1008 -10143 0
 10139 -10140  10141  1008  10144 0

c  1-1 --> 0
c    (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0 ∧ -p_1008) -> (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧ -b^{7, 145}_0)
c  in CNF:
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_2
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_1
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_0
c  in DIMACS:
 10139  10140 -10141  1008 -10142 0
 10139  10140 -10141  1008 -10143 0
 10139  10140 -10141  1008 -10144 0

c  0-1 --> -1
c    (-b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧ -p_1008) -> ( b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0)
c  in CNF:
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨  b^{7, 145}_2
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_1
c     b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨  b^{7, 145}_0
c  in DIMACS:
 10139  10140  10141  1008  10142 0
 10139  10140  10141  1008 -10143 0
 10139  10140  10141  1008  10144 0

c  -1-1 --> -2
c    ( b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧  b^{7, 144}_0 ∧ -p_1008) -> ( b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0)
c  in CNF:
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨  b^{7, 145}_2
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨  b^{7, 145}_1
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨  p_1008 ∨ -b^{7, 145}_0
c  in DIMACS:
-10139  10140 -10141  1008  10142 0
-10139  10140 -10141  1008  10143 0
-10139  10140 -10141  1008 -10144 0

c  -2-1 --> break 
c    ( b^{7, 144}_2 ∧  b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨  b^{7, 144}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-10139 -10140  10141  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 144}_2 ∧ -b^{7, 144}_1 ∧ -b^{7, 144}_0 ∧ true) 
c  in CNF:
c    -b^{7, 144}_2 ∨  b^{7, 144}_1 ∨  b^{7, 144}_0 ∨ false 
c  in DIMACS:
-10139  10140  10141  0

c  3 does not represent an automaton state.
c    -(-b^{7, 144}_2 ∧  b^{7, 144}_1 ∧  b^{7, 144}_0 ∧ true) 
c  in CNF:
c     b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ false 
c  in DIMACS:
 10139 -10140 -10141  0
c  -3 does not represent an automaton state.
c    -( b^{7, 144}_2 ∧  b^{7, 144}_1 ∧  b^{7, 144}_0 ∧ true) 
c  in CNF:
c    -b^{7, 144}_2 ∨ -b^{7, 144}_1 ∨ -b^{7, 144}_0 ∨ false 
c  in DIMACS:
-10139 -10140 -10141  0

c i = 145
c  -2+1 --> -1
c    ( b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧  p_1015) -> ( b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0)
c  in CNF:
c    -b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨  b^{7, 146}_2
c    -b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_1
c    -b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨  b^{7, 146}_0
c  in DIMACS:
-10142 -10143  10144 -1015  10145 0
-10142 -10143  10144 -1015 -10146 0
-10142 -10143  10144 -1015  10147 0

c  -1+1 --> 0
c    ( b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0 ∧  p_1015) -> (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧ -b^{7, 146}_0)
c  in CNF:
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_2
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_1
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_0
c  in DIMACS:
-10142  10143 -10144 -1015 -10145 0
-10142  10143 -10144 -1015 -10146 0
-10142  10143 -10144 -1015 -10147 0

c  0+1 --> 1
c    (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧  p_1015) -> (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0)
c  in CNF:
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_2
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_1
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨  b^{7, 146}_0
c  in DIMACS:
 10142  10143  10144 -1015 -10145 0
 10142  10143  10144 -1015 -10146 0
 10142  10143  10144 -1015  10147 0

c  1+1 --> 2
c    (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0 ∧  p_1015) -> (-b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0)
c  in CNF:
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_2
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨  b^{7, 146}_1
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ -p_1015 ∨ -b^{7, 146}_0
c  in DIMACS:
 10142  10143 -10144 -1015 -10145 0
 10142  10143 -10144 -1015  10146 0
 10142  10143 -10144 -1015 -10147 0

c  2+1 --> break 
c    (-b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 10142 -10143  10144 -1015 1162 0


c  2-1 --> 1
c    (-b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧ -p_1015) -> (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0)
c  in CNF:
c     b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_2
c     b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_1
c     b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨  b^{7, 146}_0
c  in DIMACS:
 10142 -10143  10144  1015 -10145 0
 10142 -10143  10144  1015 -10146 0
 10142 -10143  10144  1015  10147 0

c  1-1 --> 0
c    (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0 ∧ -p_1015) -> (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧ -b^{7, 146}_0)
c  in CNF:
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_2
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_1
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_0
c  in DIMACS:
 10142  10143 -10144  1015 -10145 0
 10142  10143 -10144  1015 -10146 0
 10142  10143 -10144  1015 -10147 0

c  0-1 --> -1
c    (-b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧ -p_1015) -> ( b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0)
c  in CNF:
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨  b^{7, 146}_2
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_1
c     b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨  b^{7, 146}_0
c  in DIMACS:
 10142  10143  10144  1015  10145 0
 10142  10143  10144  1015 -10146 0
 10142  10143  10144  1015  10147 0

c  -1-1 --> -2
c    ( b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧  b^{7, 145}_0 ∧ -p_1015) -> ( b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0)
c  in CNF:
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨  b^{7, 146}_2
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨  b^{7, 146}_1
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨  p_1015 ∨ -b^{7, 146}_0
c  in DIMACS:
-10142  10143 -10144  1015  10145 0
-10142  10143 -10144  1015  10146 0
-10142  10143 -10144  1015 -10147 0

c  -2-1 --> break 
c    ( b^{7, 145}_2 ∧  b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨  b^{7, 145}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-10142 -10143  10144  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 145}_2 ∧ -b^{7, 145}_1 ∧ -b^{7, 145}_0 ∧ true) 
c  in CNF:
c    -b^{7, 145}_2 ∨  b^{7, 145}_1 ∨  b^{7, 145}_0 ∨ false 
c  in DIMACS:
-10142  10143  10144  0

c  3 does not represent an automaton state.
c    -(-b^{7, 145}_2 ∧  b^{7, 145}_1 ∧  b^{7, 145}_0 ∧ true) 
c  in CNF:
c     b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ false 
c  in DIMACS:
 10142 -10143 -10144  0
c  -3 does not represent an automaton state.
c    -( b^{7, 145}_2 ∧  b^{7, 145}_1 ∧  b^{7, 145}_0 ∧ true) 
c  in CNF:
c    -b^{7, 145}_2 ∨ -b^{7, 145}_1 ∨ -b^{7, 145}_0 ∨ false 
c  in DIMACS:
-10142 -10143 -10144  0

c i = 146
c  -2+1 --> -1
c    ( b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧  p_1022) -> ( b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0)
c  in CNF:
c    -b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨  b^{7, 147}_2
c    -b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_1
c    -b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨  b^{7, 147}_0
c  in DIMACS:
-10145 -10146  10147 -1022  10148 0
-10145 -10146  10147 -1022 -10149 0
-10145 -10146  10147 -1022  10150 0

c  -1+1 --> 0
c    ( b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0 ∧  p_1022) -> (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧ -b^{7, 147}_0)
c  in CNF:
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_2
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_1
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_0
c  in DIMACS:
-10145  10146 -10147 -1022 -10148 0
-10145  10146 -10147 -1022 -10149 0
-10145  10146 -10147 -1022 -10150 0

c  0+1 --> 1
c    (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧  p_1022) -> (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0)
c  in CNF:
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_2
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_1
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨  b^{7, 147}_0
c  in DIMACS:
 10145  10146  10147 -1022 -10148 0
 10145  10146  10147 -1022 -10149 0
 10145  10146  10147 -1022  10150 0

c  1+1 --> 2
c    (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0 ∧  p_1022) -> (-b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0)
c  in CNF:
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_2
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨  b^{7, 147}_1
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ -p_1022 ∨ -b^{7, 147}_0
c  in DIMACS:
 10145  10146 -10147 -1022 -10148 0
 10145  10146 -10147 -1022  10149 0
 10145  10146 -10147 -1022 -10150 0

c  2+1 --> break 
c    (-b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 10145 -10146  10147 -1022 1162 0


c  2-1 --> 1
c    (-b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧ -p_1022) -> (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0)
c  in CNF:
c     b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_2
c     b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_1
c     b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨  b^{7, 147}_0
c  in DIMACS:
 10145 -10146  10147  1022 -10148 0
 10145 -10146  10147  1022 -10149 0
 10145 -10146  10147  1022  10150 0

c  1-1 --> 0
c    (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0 ∧ -p_1022) -> (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧ -b^{7, 147}_0)
c  in CNF:
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_2
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_1
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_0
c  in DIMACS:
 10145  10146 -10147  1022 -10148 0
 10145  10146 -10147  1022 -10149 0
 10145  10146 -10147  1022 -10150 0

c  0-1 --> -1
c    (-b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧ -p_1022) -> ( b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0)
c  in CNF:
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨  b^{7, 147}_2
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_1
c     b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨  b^{7, 147}_0
c  in DIMACS:
 10145  10146  10147  1022  10148 0
 10145  10146  10147  1022 -10149 0
 10145  10146  10147  1022  10150 0

c  -1-1 --> -2
c    ( b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧  b^{7, 146}_0 ∧ -p_1022) -> ( b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0)
c  in CNF:
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨  b^{7, 147}_2
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨  b^{7, 147}_1
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨  p_1022 ∨ -b^{7, 147}_0
c  in DIMACS:
-10145  10146 -10147  1022  10148 0
-10145  10146 -10147  1022  10149 0
-10145  10146 -10147  1022 -10150 0

c  -2-1 --> break 
c    ( b^{7, 146}_2 ∧  b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨  b^{7, 146}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-10145 -10146  10147  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 146}_2 ∧ -b^{7, 146}_1 ∧ -b^{7, 146}_0 ∧ true) 
c  in CNF:
c    -b^{7, 146}_2 ∨  b^{7, 146}_1 ∨  b^{7, 146}_0 ∨ false 
c  in DIMACS:
-10145  10146  10147  0

c  3 does not represent an automaton state.
c    -(-b^{7, 146}_2 ∧  b^{7, 146}_1 ∧  b^{7, 146}_0 ∧ true) 
c  in CNF:
c     b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ false 
c  in DIMACS:
 10145 -10146 -10147  0
c  -3 does not represent an automaton state.
c    -( b^{7, 146}_2 ∧  b^{7, 146}_1 ∧  b^{7, 146}_0 ∧ true) 
c  in CNF:
c    -b^{7, 146}_2 ∨ -b^{7, 146}_1 ∨ -b^{7, 146}_0 ∨ false 
c  in DIMACS:
-10145 -10146 -10147  0

c i = 147
c  -2+1 --> -1
c    ( b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧  p_1029) -> ( b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0)
c  in CNF:
c    -b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨  b^{7, 148}_2
c    -b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_1
c    -b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨  b^{7, 148}_0
c  in DIMACS:
-10148 -10149  10150 -1029  10151 0
-10148 -10149  10150 -1029 -10152 0
-10148 -10149  10150 -1029  10153 0

c  -1+1 --> 0
c    ( b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0 ∧  p_1029) -> (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧ -b^{7, 148}_0)
c  in CNF:
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_2
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_1
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_0
c  in DIMACS:
-10148  10149 -10150 -1029 -10151 0
-10148  10149 -10150 -1029 -10152 0
-10148  10149 -10150 -1029 -10153 0

c  0+1 --> 1
c    (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧  p_1029) -> (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0)
c  in CNF:
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_2
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_1
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨  b^{7, 148}_0
c  in DIMACS:
 10148  10149  10150 -1029 -10151 0
 10148  10149  10150 -1029 -10152 0
 10148  10149  10150 -1029  10153 0

c  1+1 --> 2
c    (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0 ∧  p_1029) -> (-b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0)
c  in CNF:
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_2
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨  b^{7, 148}_1
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ -p_1029 ∨ -b^{7, 148}_0
c  in DIMACS:
 10148  10149 -10150 -1029 -10151 0
 10148  10149 -10150 -1029  10152 0
 10148  10149 -10150 -1029 -10153 0

c  2+1 --> break 
c    (-b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 10148 -10149  10150 -1029 1162 0


c  2-1 --> 1
c    (-b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧ -p_1029) -> (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0)
c  in CNF:
c     b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_2
c     b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_1
c     b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨  b^{7, 148}_0
c  in DIMACS:
 10148 -10149  10150  1029 -10151 0
 10148 -10149  10150  1029 -10152 0
 10148 -10149  10150  1029  10153 0

c  1-1 --> 0
c    (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0 ∧ -p_1029) -> (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧ -b^{7, 148}_0)
c  in CNF:
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_2
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_1
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_0
c  in DIMACS:
 10148  10149 -10150  1029 -10151 0
 10148  10149 -10150  1029 -10152 0
 10148  10149 -10150  1029 -10153 0

c  0-1 --> -1
c    (-b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧ -p_1029) -> ( b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0)
c  in CNF:
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨  b^{7, 148}_2
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_1
c     b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨  b^{7, 148}_0
c  in DIMACS:
 10148  10149  10150  1029  10151 0
 10148  10149  10150  1029 -10152 0
 10148  10149  10150  1029  10153 0

c  -1-1 --> -2
c    ( b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧  b^{7, 147}_0 ∧ -p_1029) -> ( b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0)
c  in CNF:
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨  b^{7, 148}_2
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨  b^{7, 148}_1
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨  p_1029 ∨ -b^{7, 148}_0
c  in DIMACS:
-10148  10149 -10150  1029  10151 0
-10148  10149 -10150  1029  10152 0
-10148  10149 -10150  1029 -10153 0

c  -2-1 --> break 
c    ( b^{7, 147}_2 ∧  b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨  b^{7, 147}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-10148 -10149  10150  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 147}_2 ∧ -b^{7, 147}_1 ∧ -b^{7, 147}_0 ∧ true) 
c  in CNF:
c    -b^{7, 147}_2 ∨  b^{7, 147}_1 ∨  b^{7, 147}_0 ∨ false 
c  in DIMACS:
-10148  10149  10150  0

c  3 does not represent an automaton state.
c    -(-b^{7, 147}_2 ∧  b^{7, 147}_1 ∧  b^{7, 147}_0 ∧ true) 
c  in CNF:
c     b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ false 
c  in DIMACS:
 10148 -10149 -10150  0
c  -3 does not represent an automaton state.
c    -( b^{7, 147}_2 ∧  b^{7, 147}_1 ∧  b^{7, 147}_0 ∧ true) 
c  in CNF:
c    -b^{7, 147}_2 ∨ -b^{7, 147}_1 ∨ -b^{7, 147}_0 ∨ false 
c  in DIMACS:
-10148 -10149 -10150  0

c i = 148
c  -2+1 --> -1
c    ( b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧  p_1036) -> ( b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0)
c  in CNF:
c    -b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨  b^{7, 149}_2
c    -b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_1
c    -b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨  b^{7, 149}_0
c  in DIMACS:
-10151 -10152  10153 -1036  10154 0
-10151 -10152  10153 -1036 -10155 0
-10151 -10152  10153 -1036  10156 0

c  -1+1 --> 0
c    ( b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0 ∧  p_1036) -> (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧ -b^{7, 149}_0)
c  in CNF:
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_2
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_1
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_0
c  in DIMACS:
-10151  10152 -10153 -1036 -10154 0
-10151  10152 -10153 -1036 -10155 0
-10151  10152 -10153 -1036 -10156 0

c  0+1 --> 1
c    (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧  p_1036) -> (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0)
c  in CNF:
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_2
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_1
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨  b^{7, 149}_0
c  in DIMACS:
 10151  10152  10153 -1036 -10154 0
 10151  10152  10153 -1036 -10155 0
 10151  10152  10153 -1036  10156 0

c  1+1 --> 2
c    (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0 ∧  p_1036) -> (-b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0)
c  in CNF:
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_2
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨  b^{7, 149}_1
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ -p_1036 ∨ -b^{7, 149}_0
c  in DIMACS:
 10151  10152 -10153 -1036 -10154 0
 10151  10152 -10153 -1036  10155 0
 10151  10152 -10153 -1036 -10156 0

c  2+1 --> break 
c    (-b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 10151 -10152  10153 -1036 1162 0


c  2-1 --> 1
c    (-b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧ -p_1036) -> (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0)
c  in CNF:
c     b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_2
c     b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_1
c     b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨  b^{7, 149}_0
c  in DIMACS:
 10151 -10152  10153  1036 -10154 0
 10151 -10152  10153  1036 -10155 0
 10151 -10152  10153  1036  10156 0

c  1-1 --> 0
c    (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0 ∧ -p_1036) -> (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧ -b^{7, 149}_0)
c  in CNF:
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_2
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_1
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_0
c  in DIMACS:
 10151  10152 -10153  1036 -10154 0
 10151  10152 -10153  1036 -10155 0
 10151  10152 -10153  1036 -10156 0

c  0-1 --> -1
c    (-b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧ -p_1036) -> ( b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0)
c  in CNF:
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨  b^{7, 149}_2
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_1
c     b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨  b^{7, 149}_0
c  in DIMACS:
 10151  10152  10153  1036  10154 0
 10151  10152  10153  1036 -10155 0
 10151  10152  10153  1036  10156 0

c  -1-1 --> -2
c    ( b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧  b^{7, 148}_0 ∧ -p_1036) -> ( b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0)
c  in CNF:
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨  b^{7, 149}_2
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨  b^{7, 149}_1
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨  p_1036 ∨ -b^{7, 149}_0
c  in DIMACS:
-10151  10152 -10153  1036  10154 0
-10151  10152 -10153  1036  10155 0
-10151  10152 -10153  1036 -10156 0

c  -2-1 --> break 
c    ( b^{7, 148}_2 ∧  b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨  b^{7, 148}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-10151 -10152  10153  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 148}_2 ∧ -b^{7, 148}_1 ∧ -b^{7, 148}_0 ∧ true) 
c  in CNF:
c    -b^{7, 148}_2 ∨  b^{7, 148}_1 ∨  b^{7, 148}_0 ∨ false 
c  in DIMACS:
-10151  10152  10153  0

c  3 does not represent an automaton state.
c    -(-b^{7, 148}_2 ∧  b^{7, 148}_1 ∧  b^{7, 148}_0 ∧ true) 
c  in CNF:
c     b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ false 
c  in DIMACS:
 10151 -10152 -10153  0
c  -3 does not represent an automaton state.
c    -( b^{7, 148}_2 ∧  b^{7, 148}_1 ∧  b^{7, 148}_0 ∧ true) 
c  in CNF:
c    -b^{7, 148}_2 ∨ -b^{7, 148}_1 ∨ -b^{7, 148}_0 ∨ false 
c  in DIMACS:
-10151 -10152 -10153  0

c i = 149
c  -2+1 --> -1
c    ( b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧  p_1043) -> ( b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0)
c  in CNF:
c    -b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨  b^{7, 150}_2
c    -b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_1
c    -b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨  b^{7, 150}_0
c  in DIMACS:
-10154 -10155  10156 -1043  10157 0
-10154 -10155  10156 -1043 -10158 0
-10154 -10155  10156 -1043  10159 0

c  -1+1 --> 0
c    ( b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0 ∧  p_1043) -> (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧ -b^{7, 150}_0)
c  in CNF:
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_2
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_1
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_0
c  in DIMACS:
-10154  10155 -10156 -1043 -10157 0
-10154  10155 -10156 -1043 -10158 0
-10154  10155 -10156 -1043 -10159 0

c  0+1 --> 1
c    (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧  p_1043) -> (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0)
c  in CNF:
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_2
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_1
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨  b^{7, 150}_0
c  in DIMACS:
 10154  10155  10156 -1043 -10157 0
 10154  10155  10156 -1043 -10158 0
 10154  10155  10156 -1043  10159 0

c  1+1 --> 2
c    (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0 ∧  p_1043) -> (-b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0)
c  in CNF:
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_2
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨  b^{7, 150}_1
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ -p_1043 ∨ -b^{7, 150}_0
c  in DIMACS:
 10154  10155 -10156 -1043 -10157 0
 10154  10155 -10156 -1043  10158 0
 10154  10155 -10156 -1043 -10159 0

c  2+1 --> break 
c    (-b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧  p_1043) -> break
c  in CNF:
c     b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ -p_1043 ∨ break
c  in DIMACS:
 10154 -10155  10156 -1043 1162 0


c  2-1 --> 1
c    (-b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧ -p_1043) -> (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0)
c  in CNF:
c     b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_2
c     b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_1
c     b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨  b^{7, 150}_0
c  in DIMACS:
 10154 -10155  10156  1043 -10157 0
 10154 -10155  10156  1043 -10158 0
 10154 -10155  10156  1043  10159 0

c  1-1 --> 0
c    (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0 ∧ -p_1043) -> (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧ -b^{7, 150}_0)
c  in CNF:
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_2
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_1
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_0
c  in DIMACS:
 10154  10155 -10156  1043 -10157 0
 10154  10155 -10156  1043 -10158 0
 10154  10155 -10156  1043 -10159 0

c  0-1 --> -1
c    (-b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧ -p_1043) -> ( b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0)
c  in CNF:
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨  b^{7, 150}_2
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_1
c     b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨  b^{7, 150}_0
c  in DIMACS:
 10154  10155  10156  1043  10157 0
 10154  10155  10156  1043 -10158 0
 10154  10155  10156  1043  10159 0

c  -1-1 --> -2
c    ( b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧  b^{7, 149}_0 ∧ -p_1043) -> ( b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0)
c  in CNF:
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨  b^{7, 150}_2
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨  b^{7, 150}_1
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨  p_1043 ∨ -b^{7, 150}_0
c  in DIMACS:
-10154  10155 -10156  1043  10157 0
-10154  10155 -10156  1043  10158 0
-10154  10155 -10156  1043 -10159 0

c  -2-1 --> break 
c    ( b^{7, 149}_2 ∧  b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧ -p_1043) -> break
c  in CNF:
c    -b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨  b^{7, 149}_0 ∨  p_1043 ∨ break
c  in DIMACS:
-10154 -10155  10156  1043 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 149}_2 ∧ -b^{7, 149}_1 ∧ -b^{7, 149}_0 ∧ true) 
c  in CNF:
c    -b^{7, 149}_2 ∨  b^{7, 149}_1 ∨  b^{7, 149}_0 ∨ false 
c  in DIMACS:
-10154  10155  10156  0

c  3 does not represent an automaton state.
c    -(-b^{7, 149}_2 ∧  b^{7, 149}_1 ∧  b^{7, 149}_0 ∧ true) 
c  in CNF:
c     b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ false 
c  in DIMACS:
 10154 -10155 -10156  0
c  -3 does not represent an automaton state.
c    -( b^{7, 149}_2 ∧  b^{7, 149}_1 ∧  b^{7, 149}_0 ∧ true) 
c  in CNF:
c    -b^{7, 149}_2 ∨ -b^{7, 149}_1 ∨ -b^{7, 149}_0 ∨ false 
c  in DIMACS:
-10154 -10155 -10156  0

c i = 150
c  -2+1 --> -1
c    ( b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧  p_1050) -> ( b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0)
c  in CNF:
c    -b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨  b^{7, 151}_2
c    -b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_1
c    -b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨  b^{7, 151}_0
c  in DIMACS:
-10157 -10158  10159 -1050  10160 0
-10157 -10158  10159 -1050 -10161 0
-10157 -10158  10159 -1050  10162 0

c  -1+1 --> 0
c    ( b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0 ∧  p_1050) -> (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧ -b^{7, 151}_0)
c  in CNF:
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_2
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_1
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_0
c  in DIMACS:
-10157  10158 -10159 -1050 -10160 0
-10157  10158 -10159 -1050 -10161 0
-10157  10158 -10159 -1050 -10162 0

c  0+1 --> 1
c    (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧  p_1050) -> (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0)
c  in CNF:
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_2
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_1
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨  b^{7, 151}_0
c  in DIMACS:
 10157  10158  10159 -1050 -10160 0
 10157  10158  10159 -1050 -10161 0
 10157  10158  10159 -1050  10162 0

c  1+1 --> 2
c    (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0 ∧  p_1050) -> (-b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0)
c  in CNF:
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_2
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨  b^{7, 151}_1
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ -p_1050 ∨ -b^{7, 151}_0
c  in DIMACS:
 10157  10158 -10159 -1050 -10160 0
 10157  10158 -10159 -1050  10161 0
 10157  10158 -10159 -1050 -10162 0

c  2+1 --> break 
c    (-b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 10157 -10158  10159 -1050 1162 0


c  2-1 --> 1
c    (-b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧ -p_1050) -> (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0)
c  in CNF:
c     b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_2
c     b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_1
c     b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨  b^{7, 151}_0
c  in DIMACS:
 10157 -10158  10159  1050 -10160 0
 10157 -10158  10159  1050 -10161 0
 10157 -10158  10159  1050  10162 0

c  1-1 --> 0
c    (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0 ∧ -p_1050) -> (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧ -b^{7, 151}_0)
c  in CNF:
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_2
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_1
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_0
c  in DIMACS:
 10157  10158 -10159  1050 -10160 0
 10157  10158 -10159  1050 -10161 0
 10157  10158 -10159  1050 -10162 0

c  0-1 --> -1
c    (-b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧ -p_1050) -> ( b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0)
c  in CNF:
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨  b^{7, 151}_2
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_1
c     b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨  b^{7, 151}_0
c  in DIMACS:
 10157  10158  10159  1050  10160 0
 10157  10158  10159  1050 -10161 0
 10157  10158  10159  1050  10162 0

c  -1-1 --> -2
c    ( b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧  b^{7, 150}_0 ∧ -p_1050) -> ( b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0)
c  in CNF:
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨  b^{7, 151}_2
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨  b^{7, 151}_1
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨  p_1050 ∨ -b^{7, 151}_0
c  in DIMACS:
-10157  10158 -10159  1050  10160 0
-10157  10158 -10159  1050  10161 0
-10157  10158 -10159  1050 -10162 0

c  -2-1 --> break 
c    ( b^{7, 150}_2 ∧  b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨  b^{7, 150}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-10157 -10158  10159  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 150}_2 ∧ -b^{7, 150}_1 ∧ -b^{7, 150}_0 ∧ true) 
c  in CNF:
c    -b^{7, 150}_2 ∨  b^{7, 150}_1 ∨  b^{7, 150}_0 ∨ false 
c  in DIMACS:
-10157  10158  10159  0

c  3 does not represent an automaton state.
c    -(-b^{7, 150}_2 ∧  b^{7, 150}_1 ∧  b^{7, 150}_0 ∧ true) 
c  in CNF:
c     b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ false 
c  in DIMACS:
 10157 -10158 -10159  0
c  -3 does not represent an automaton state.
c    -( b^{7, 150}_2 ∧  b^{7, 150}_1 ∧  b^{7, 150}_0 ∧ true) 
c  in CNF:
c    -b^{7, 150}_2 ∨ -b^{7, 150}_1 ∨ -b^{7, 150}_0 ∨ false 
c  in DIMACS:
-10157 -10158 -10159  0

c i = 151
c  -2+1 --> -1
c    ( b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧  p_1057) -> ( b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0)
c  in CNF:
c    -b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨  b^{7, 152}_2
c    -b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_1
c    -b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨  b^{7, 152}_0
c  in DIMACS:
-10160 -10161  10162 -1057  10163 0
-10160 -10161  10162 -1057 -10164 0
-10160 -10161  10162 -1057  10165 0

c  -1+1 --> 0
c    ( b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0 ∧  p_1057) -> (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧ -b^{7, 152}_0)
c  in CNF:
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_2
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_1
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_0
c  in DIMACS:
-10160  10161 -10162 -1057 -10163 0
-10160  10161 -10162 -1057 -10164 0
-10160  10161 -10162 -1057 -10165 0

c  0+1 --> 1
c    (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧  p_1057) -> (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0)
c  in CNF:
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_2
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_1
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨  b^{7, 152}_0
c  in DIMACS:
 10160  10161  10162 -1057 -10163 0
 10160  10161  10162 -1057 -10164 0
 10160  10161  10162 -1057  10165 0

c  1+1 --> 2
c    (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0 ∧  p_1057) -> (-b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0)
c  in CNF:
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_2
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨  b^{7, 152}_1
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ -p_1057 ∨ -b^{7, 152}_0
c  in DIMACS:
 10160  10161 -10162 -1057 -10163 0
 10160  10161 -10162 -1057  10164 0
 10160  10161 -10162 -1057 -10165 0

c  2+1 --> break 
c    (-b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧  p_1057) -> break
c  in CNF:
c     b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ -p_1057 ∨ break
c  in DIMACS:
 10160 -10161  10162 -1057 1162 0


c  2-1 --> 1
c    (-b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧ -p_1057) -> (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0)
c  in CNF:
c     b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_2
c     b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_1
c     b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨  b^{7, 152}_0
c  in DIMACS:
 10160 -10161  10162  1057 -10163 0
 10160 -10161  10162  1057 -10164 0
 10160 -10161  10162  1057  10165 0

c  1-1 --> 0
c    (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0 ∧ -p_1057) -> (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧ -b^{7, 152}_0)
c  in CNF:
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_2
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_1
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_0
c  in DIMACS:
 10160  10161 -10162  1057 -10163 0
 10160  10161 -10162  1057 -10164 0
 10160  10161 -10162  1057 -10165 0

c  0-1 --> -1
c    (-b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧ -p_1057) -> ( b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0)
c  in CNF:
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨  b^{7, 152}_2
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_1
c     b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨  b^{7, 152}_0
c  in DIMACS:
 10160  10161  10162  1057  10163 0
 10160  10161  10162  1057 -10164 0
 10160  10161  10162  1057  10165 0

c  -1-1 --> -2
c    ( b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧  b^{7, 151}_0 ∧ -p_1057) -> ( b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0)
c  in CNF:
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨  b^{7, 152}_2
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨  b^{7, 152}_1
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨  p_1057 ∨ -b^{7, 152}_0
c  in DIMACS:
-10160  10161 -10162  1057  10163 0
-10160  10161 -10162  1057  10164 0
-10160  10161 -10162  1057 -10165 0

c  -2-1 --> break 
c    ( b^{7, 151}_2 ∧  b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧ -p_1057) -> break
c  in CNF:
c    -b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨  b^{7, 151}_0 ∨  p_1057 ∨ break
c  in DIMACS:
-10160 -10161  10162  1057 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 151}_2 ∧ -b^{7, 151}_1 ∧ -b^{7, 151}_0 ∧ true) 
c  in CNF:
c    -b^{7, 151}_2 ∨  b^{7, 151}_1 ∨  b^{7, 151}_0 ∨ false 
c  in DIMACS:
-10160  10161  10162  0

c  3 does not represent an automaton state.
c    -(-b^{7, 151}_2 ∧  b^{7, 151}_1 ∧  b^{7, 151}_0 ∧ true) 
c  in CNF:
c     b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ false 
c  in DIMACS:
 10160 -10161 -10162  0
c  -3 does not represent an automaton state.
c    -( b^{7, 151}_2 ∧  b^{7, 151}_1 ∧  b^{7, 151}_0 ∧ true) 
c  in CNF:
c    -b^{7, 151}_2 ∨ -b^{7, 151}_1 ∨ -b^{7, 151}_0 ∨ false 
c  in DIMACS:
-10160 -10161 -10162  0

c i = 152
c  -2+1 --> -1
c    ( b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧  p_1064) -> ( b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0)
c  in CNF:
c    -b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨  b^{7, 153}_2
c    -b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_1
c    -b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨  b^{7, 153}_0
c  in DIMACS:
-10163 -10164  10165 -1064  10166 0
-10163 -10164  10165 -1064 -10167 0
-10163 -10164  10165 -1064  10168 0

c  -1+1 --> 0
c    ( b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0 ∧  p_1064) -> (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧ -b^{7, 153}_0)
c  in CNF:
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_2
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_1
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_0
c  in DIMACS:
-10163  10164 -10165 -1064 -10166 0
-10163  10164 -10165 -1064 -10167 0
-10163  10164 -10165 -1064 -10168 0

c  0+1 --> 1
c    (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧  p_1064) -> (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0)
c  in CNF:
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_2
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_1
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨  b^{7, 153}_0
c  in DIMACS:
 10163  10164  10165 -1064 -10166 0
 10163  10164  10165 -1064 -10167 0
 10163  10164  10165 -1064  10168 0

c  1+1 --> 2
c    (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0 ∧  p_1064) -> (-b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0)
c  in CNF:
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_2
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨  b^{7, 153}_1
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ -p_1064 ∨ -b^{7, 153}_0
c  in DIMACS:
 10163  10164 -10165 -1064 -10166 0
 10163  10164 -10165 -1064  10167 0
 10163  10164 -10165 -1064 -10168 0

c  2+1 --> break 
c    (-b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 10163 -10164  10165 -1064 1162 0


c  2-1 --> 1
c    (-b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧ -p_1064) -> (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0)
c  in CNF:
c     b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_2
c     b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_1
c     b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨  b^{7, 153}_0
c  in DIMACS:
 10163 -10164  10165  1064 -10166 0
 10163 -10164  10165  1064 -10167 0
 10163 -10164  10165  1064  10168 0

c  1-1 --> 0
c    (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0 ∧ -p_1064) -> (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧ -b^{7, 153}_0)
c  in CNF:
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_2
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_1
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_0
c  in DIMACS:
 10163  10164 -10165  1064 -10166 0
 10163  10164 -10165  1064 -10167 0
 10163  10164 -10165  1064 -10168 0

c  0-1 --> -1
c    (-b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧ -p_1064) -> ( b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0)
c  in CNF:
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨  b^{7, 153}_2
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_1
c     b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨  b^{7, 153}_0
c  in DIMACS:
 10163  10164  10165  1064  10166 0
 10163  10164  10165  1064 -10167 0
 10163  10164  10165  1064  10168 0

c  -1-1 --> -2
c    ( b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧  b^{7, 152}_0 ∧ -p_1064) -> ( b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0)
c  in CNF:
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨  b^{7, 153}_2
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨  b^{7, 153}_1
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨  p_1064 ∨ -b^{7, 153}_0
c  in DIMACS:
-10163  10164 -10165  1064  10166 0
-10163  10164 -10165  1064  10167 0
-10163  10164 -10165  1064 -10168 0

c  -2-1 --> break 
c    ( b^{7, 152}_2 ∧  b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨  b^{7, 152}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-10163 -10164  10165  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 152}_2 ∧ -b^{7, 152}_1 ∧ -b^{7, 152}_0 ∧ true) 
c  in CNF:
c    -b^{7, 152}_2 ∨  b^{7, 152}_1 ∨  b^{7, 152}_0 ∨ false 
c  in DIMACS:
-10163  10164  10165  0

c  3 does not represent an automaton state.
c    -(-b^{7, 152}_2 ∧  b^{7, 152}_1 ∧  b^{7, 152}_0 ∧ true) 
c  in CNF:
c     b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ false 
c  in DIMACS:
 10163 -10164 -10165  0
c  -3 does not represent an automaton state.
c    -( b^{7, 152}_2 ∧  b^{7, 152}_1 ∧  b^{7, 152}_0 ∧ true) 
c  in CNF:
c    -b^{7, 152}_2 ∨ -b^{7, 152}_1 ∨ -b^{7, 152}_0 ∨ false 
c  in DIMACS:
-10163 -10164 -10165  0

c i = 153
c  -2+1 --> -1
c    ( b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧  p_1071) -> ( b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0)
c  in CNF:
c    -b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨  b^{7, 154}_2
c    -b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_1
c    -b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨  b^{7, 154}_0
c  in DIMACS:
-10166 -10167  10168 -1071  10169 0
-10166 -10167  10168 -1071 -10170 0
-10166 -10167  10168 -1071  10171 0

c  -1+1 --> 0
c    ( b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0 ∧  p_1071) -> (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧ -b^{7, 154}_0)
c  in CNF:
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_2
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_1
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_0
c  in DIMACS:
-10166  10167 -10168 -1071 -10169 0
-10166  10167 -10168 -1071 -10170 0
-10166  10167 -10168 -1071 -10171 0

c  0+1 --> 1
c    (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧  p_1071) -> (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0)
c  in CNF:
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_2
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_1
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨  b^{7, 154}_0
c  in DIMACS:
 10166  10167  10168 -1071 -10169 0
 10166  10167  10168 -1071 -10170 0
 10166  10167  10168 -1071  10171 0

c  1+1 --> 2
c    (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0 ∧  p_1071) -> (-b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0)
c  in CNF:
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_2
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨  b^{7, 154}_1
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ -p_1071 ∨ -b^{7, 154}_0
c  in DIMACS:
 10166  10167 -10168 -1071 -10169 0
 10166  10167 -10168 -1071  10170 0
 10166  10167 -10168 -1071 -10171 0

c  2+1 --> break 
c    (-b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 10166 -10167  10168 -1071 1162 0


c  2-1 --> 1
c    (-b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧ -p_1071) -> (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0)
c  in CNF:
c     b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_2
c     b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_1
c     b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨  b^{7, 154}_0
c  in DIMACS:
 10166 -10167  10168  1071 -10169 0
 10166 -10167  10168  1071 -10170 0
 10166 -10167  10168  1071  10171 0

c  1-1 --> 0
c    (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0 ∧ -p_1071) -> (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧ -b^{7, 154}_0)
c  in CNF:
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_2
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_1
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_0
c  in DIMACS:
 10166  10167 -10168  1071 -10169 0
 10166  10167 -10168  1071 -10170 0
 10166  10167 -10168  1071 -10171 0

c  0-1 --> -1
c    (-b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧ -p_1071) -> ( b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0)
c  in CNF:
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨  b^{7, 154}_2
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_1
c     b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨  b^{7, 154}_0
c  in DIMACS:
 10166  10167  10168  1071  10169 0
 10166  10167  10168  1071 -10170 0
 10166  10167  10168  1071  10171 0

c  -1-1 --> -2
c    ( b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧  b^{7, 153}_0 ∧ -p_1071) -> ( b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0)
c  in CNF:
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨  b^{7, 154}_2
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨  b^{7, 154}_1
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨  p_1071 ∨ -b^{7, 154}_0
c  in DIMACS:
-10166  10167 -10168  1071  10169 0
-10166  10167 -10168  1071  10170 0
-10166  10167 -10168  1071 -10171 0

c  -2-1 --> break 
c    ( b^{7, 153}_2 ∧  b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨  b^{7, 153}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-10166 -10167  10168  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 153}_2 ∧ -b^{7, 153}_1 ∧ -b^{7, 153}_0 ∧ true) 
c  in CNF:
c    -b^{7, 153}_2 ∨  b^{7, 153}_1 ∨  b^{7, 153}_0 ∨ false 
c  in DIMACS:
-10166  10167  10168  0

c  3 does not represent an automaton state.
c    -(-b^{7, 153}_2 ∧  b^{7, 153}_1 ∧  b^{7, 153}_0 ∧ true) 
c  in CNF:
c     b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ false 
c  in DIMACS:
 10166 -10167 -10168  0
c  -3 does not represent an automaton state.
c    -( b^{7, 153}_2 ∧  b^{7, 153}_1 ∧  b^{7, 153}_0 ∧ true) 
c  in CNF:
c    -b^{7, 153}_2 ∨ -b^{7, 153}_1 ∨ -b^{7, 153}_0 ∨ false 
c  in DIMACS:
-10166 -10167 -10168  0

c i = 154
c  -2+1 --> -1
c    ( b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧  p_1078) -> ( b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0)
c  in CNF:
c    -b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨  b^{7, 155}_2
c    -b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_1
c    -b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨  b^{7, 155}_0
c  in DIMACS:
-10169 -10170  10171 -1078  10172 0
-10169 -10170  10171 -1078 -10173 0
-10169 -10170  10171 -1078  10174 0

c  -1+1 --> 0
c    ( b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0 ∧  p_1078) -> (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧ -b^{7, 155}_0)
c  in CNF:
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_2
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_1
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_0
c  in DIMACS:
-10169  10170 -10171 -1078 -10172 0
-10169  10170 -10171 -1078 -10173 0
-10169  10170 -10171 -1078 -10174 0

c  0+1 --> 1
c    (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧  p_1078) -> (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0)
c  in CNF:
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_2
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_1
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨  b^{7, 155}_0
c  in DIMACS:
 10169  10170  10171 -1078 -10172 0
 10169  10170  10171 -1078 -10173 0
 10169  10170  10171 -1078  10174 0

c  1+1 --> 2
c    (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0 ∧  p_1078) -> (-b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0)
c  in CNF:
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_2
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨  b^{7, 155}_1
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ -p_1078 ∨ -b^{7, 155}_0
c  in DIMACS:
 10169  10170 -10171 -1078 -10172 0
 10169  10170 -10171 -1078  10173 0
 10169  10170 -10171 -1078 -10174 0

c  2+1 --> break 
c    (-b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 10169 -10170  10171 -1078 1162 0


c  2-1 --> 1
c    (-b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧ -p_1078) -> (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0)
c  in CNF:
c     b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_2
c     b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_1
c     b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨  b^{7, 155}_0
c  in DIMACS:
 10169 -10170  10171  1078 -10172 0
 10169 -10170  10171  1078 -10173 0
 10169 -10170  10171  1078  10174 0

c  1-1 --> 0
c    (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0 ∧ -p_1078) -> (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧ -b^{7, 155}_0)
c  in CNF:
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_2
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_1
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_0
c  in DIMACS:
 10169  10170 -10171  1078 -10172 0
 10169  10170 -10171  1078 -10173 0
 10169  10170 -10171  1078 -10174 0

c  0-1 --> -1
c    (-b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧ -p_1078) -> ( b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0)
c  in CNF:
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨  b^{7, 155}_2
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_1
c     b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨  b^{7, 155}_0
c  in DIMACS:
 10169  10170  10171  1078  10172 0
 10169  10170  10171  1078 -10173 0
 10169  10170  10171  1078  10174 0

c  -1-1 --> -2
c    ( b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧  b^{7, 154}_0 ∧ -p_1078) -> ( b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0)
c  in CNF:
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨  b^{7, 155}_2
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨  b^{7, 155}_1
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨  p_1078 ∨ -b^{7, 155}_0
c  in DIMACS:
-10169  10170 -10171  1078  10172 0
-10169  10170 -10171  1078  10173 0
-10169  10170 -10171  1078 -10174 0

c  -2-1 --> break 
c    ( b^{7, 154}_2 ∧  b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨  b^{7, 154}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-10169 -10170  10171  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 154}_2 ∧ -b^{7, 154}_1 ∧ -b^{7, 154}_0 ∧ true) 
c  in CNF:
c    -b^{7, 154}_2 ∨  b^{7, 154}_1 ∨  b^{7, 154}_0 ∨ false 
c  in DIMACS:
-10169  10170  10171  0

c  3 does not represent an automaton state.
c    -(-b^{7, 154}_2 ∧  b^{7, 154}_1 ∧  b^{7, 154}_0 ∧ true) 
c  in CNF:
c     b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ false 
c  in DIMACS:
 10169 -10170 -10171  0
c  -3 does not represent an automaton state.
c    -( b^{7, 154}_2 ∧  b^{7, 154}_1 ∧  b^{7, 154}_0 ∧ true) 
c  in CNF:
c    -b^{7, 154}_2 ∨ -b^{7, 154}_1 ∨ -b^{7, 154}_0 ∨ false 
c  in DIMACS:
-10169 -10170 -10171  0

c i = 155
c  -2+1 --> -1
c    ( b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧  p_1085) -> ( b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0)
c  in CNF:
c    -b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨  b^{7, 156}_2
c    -b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_1
c    -b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨  b^{7, 156}_0
c  in DIMACS:
-10172 -10173  10174 -1085  10175 0
-10172 -10173  10174 -1085 -10176 0
-10172 -10173  10174 -1085  10177 0

c  -1+1 --> 0
c    ( b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0 ∧  p_1085) -> (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧ -b^{7, 156}_0)
c  in CNF:
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_2
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_1
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_0
c  in DIMACS:
-10172  10173 -10174 -1085 -10175 0
-10172  10173 -10174 -1085 -10176 0
-10172  10173 -10174 -1085 -10177 0

c  0+1 --> 1
c    (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧  p_1085) -> (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0)
c  in CNF:
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_2
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_1
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨  b^{7, 156}_0
c  in DIMACS:
 10172  10173  10174 -1085 -10175 0
 10172  10173  10174 -1085 -10176 0
 10172  10173  10174 -1085  10177 0

c  1+1 --> 2
c    (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0 ∧  p_1085) -> (-b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0)
c  in CNF:
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_2
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨  b^{7, 156}_1
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ -p_1085 ∨ -b^{7, 156}_0
c  in DIMACS:
 10172  10173 -10174 -1085 -10175 0
 10172  10173 -10174 -1085  10176 0
 10172  10173 -10174 -1085 -10177 0

c  2+1 --> break 
c    (-b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 10172 -10173  10174 -1085 1162 0


c  2-1 --> 1
c    (-b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧ -p_1085) -> (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0)
c  in CNF:
c     b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_2
c     b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_1
c     b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨  b^{7, 156}_0
c  in DIMACS:
 10172 -10173  10174  1085 -10175 0
 10172 -10173  10174  1085 -10176 0
 10172 -10173  10174  1085  10177 0

c  1-1 --> 0
c    (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0 ∧ -p_1085) -> (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧ -b^{7, 156}_0)
c  in CNF:
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_2
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_1
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_0
c  in DIMACS:
 10172  10173 -10174  1085 -10175 0
 10172  10173 -10174  1085 -10176 0
 10172  10173 -10174  1085 -10177 0

c  0-1 --> -1
c    (-b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧ -p_1085) -> ( b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0)
c  in CNF:
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨  b^{7, 156}_2
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_1
c     b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨  b^{7, 156}_0
c  in DIMACS:
 10172  10173  10174  1085  10175 0
 10172  10173  10174  1085 -10176 0
 10172  10173  10174  1085  10177 0

c  -1-1 --> -2
c    ( b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧  b^{7, 155}_0 ∧ -p_1085) -> ( b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0)
c  in CNF:
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨  b^{7, 156}_2
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨  b^{7, 156}_1
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨  p_1085 ∨ -b^{7, 156}_0
c  in DIMACS:
-10172  10173 -10174  1085  10175 0
-10172  10173 -10174  1085  10176 0
-10172  10173 -10174  1085 -10177 0

c  -2-1 --> break 
c    ( b^{7, 155}_2 ∧  b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨  b^{7, 155}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-10172 -10173  10174  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 155}_2 ∧ -b^{7, 155}_1 ∧ -b^{7, 155}_0 ∧ true) 
c  in CNF:
c    -b^{7, 155}_2 ∨  b^{7, 155}_1 ∨  b^{7, 155}_0 ∨ false 
c  in DIMACS:
-10172  10173  10174  0

c  3 does not represent an automaton state.
c    -(-b^{7, 155}_2 ∧  b^{7, 155}_1 ∧  b^{7, 155}_0 ∧ true) 
c  in CNF:
c     b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ false 
c  in DIMACS:
 10172 -10173 -10174  0
c  -3 does not represent an automaton state.
c    -( b^{7, 155}_2 ∧  b^{7, 155}_1 ∧  b^{7, 155}_0 ∧ true) 
c  in CNF:
c    -b^{7, 155}_2 ∨ -b^{7, 155}_1 ∨ -b^{7, 155}_0 ∨ false 
c  in DIMACS:
-10172 -10173 -10174  0

c i = 156
c  -2+1 --> -1
c    ( b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧  p_1092) -> ( b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0)
c  in CNF:
c    -b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨  b^{7, 157}_2
c    -b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_1
c    -b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨  b^{7, 157}_0
c  in DIMACS:
-10175 -10176  10177 -1092  10178 0
-10175 -10176  10177 -1092 -10179 0
-10175 -10176  10177 -1092  10180 0

c  -1+1 --> 0
c    ( b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0 ∧  p_1092) -> (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧ -b^{7, 157}_0)
c  in CNF:
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_2
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_1
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_0
c  in DIMACS:
-10175  10176 -10177 -1092 -10178 0
-10175  10176 -10177 -1092 -10179 0
-10175  10176 -10177 -1092 -10180 0

c  0+1 --> 1
c    (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧  p_1092) -> (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0)
c  in CNF:
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_2
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_1
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨  b^{7, 157}_0
c  in DIMACS:
 10175  10176  10177 -1092 -10178 0
 10175  10176  10177 -1092 -10179 0
 10175  10176  10177 -1092  10180 0

c  1+1 --> 2
c    (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0 ∧  p_1092) -> (-b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0)
c  in CNF:
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_2
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨  b^{7, 157}_1
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ -p_1092 ∨ -b^{7, 157}_0
c  in DIMACS:
 10175  10176 -10177 -1092 -10178 0
 10175  10176 -10177 -1092  10179 0
 10175  10176 -10177 -1092 -10180 0

c  2+1 --> break 
c    (-b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 10175 -10176  10177 -1092 1162 0


c  2-1 --> 1
c    (-b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧ -p_1092) -> (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0)
c  in CNF:
c     b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_2
c     b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_1
c     b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨  b^{7, 157}_0
c  in DIMACS:
 10175 -10176  10177  1092 -10178 0
 10175 -10176  10177  1092 -10179 0
 10175 -10176  10177  1092  10180 0

c  1-1 --> 0
c    (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0 ∧ -p_1092) -> (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧ -b^{7, 157}_0)
c  in CNF:
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_2
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_1
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_0
c  in DIMACS:
 10175  10176 -10177  1092 -10178 0
 10175  10176 -10177  1092 -10179 0
 10175  10176 -10177  1092 -10180 0

c  0-1 --> -1
c    (-b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧ -p_1092) -> ( b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0)
c  in CNF:
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨  b^{7, 157}_2
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_1
c     b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨  b^{7, 157}_0
c  in DIMACS:
 10175  10176  10177  1092  10178 0
 10175  10176  10177  1092 -10179 0
 10175  10176  10177  1092  10180 0

c  -1-1 --> -2
c    ( b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧  b^{7, 156}_0 ∧ -p_1092) -> ( b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0)
c  in CNF:
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨  b^{7, 157}_2
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨  b^{7, 157}_1
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨  p_1092 ∨ -b^{7, 157}_0
c  in DIMACS:
-10175  10176 -10177  1092  10178 0
-10175  10176 -10177  1092  10179 0
-10175  10176 -10177  1092 -10180 0

c  -2-1 --> break 
c    ( b^{7, 156}_2 ∧  b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨  b^{7, 156}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-10175 -10176  10177  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 156}_2 ∧ -b^{7, 156}_1 ∧ -b^{7, 156}_0 ∧ true) 
c  in CNF:
c    -b^{7, 156}_2 ∨  b^{7, 156}_1 ∨  b^{7, 156}_0 ∨ false 
c  in DIMACS:
-10175  10176  10177  0

c  3 does not represent an automaton state.
c    -(-b^{7, 156}_2 ∧  b^{7, 156}_1 ∧  b^{7, 156}_0 ∧ true) 
c  in CNF:
c     b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ false 
c  in DIMACS:
 10175 -10176 -10177  0
c  -3 does not represent an automaton state.
c    -( b^{7, 156}_2 ∧  b^{7, 156}_1 ∧  b^{7, 156}_0 ∧ true) 
c  in CNF:
c    -b^{7, 156}_2 ∨ -b^{7, 156}_1 ∨ -b^{7, 156}_0 ∨ false 
c  in DIMACS:
-10175 -10176 -10177  0

c i = 157
c  -2+1 --> -1
c    ( b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧  p_1099) -> ( b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0)
c  in CNF:
c    -b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨  b^{7, 158}_2
c    -b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_1
c    -b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨  b^{7, 158}_0
c  in DIMACS:
-10178 -10179  10180 -1099  10181 0
-10178 -10179  10180 -1099 -10182 0
-10178 -10179  10180 -1099  10183 0

c  -1+1 --> 0
c    ( b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0 ∧  p_1099) -> (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧ -b^{7, 158}_0)
c  in CNF:
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_2
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_1
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_0
c  in DIMACS:
-10178  10179 -10180 -1099 -10181 0
-10178  10179 -10180 -1099 -10182 0
-10178  10179 -10180 -1099 -10183 0

c  0+1 --> 1
c    (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧  p_1099) -> (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0)
c  in CNF:
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_2
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_1
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨  b^{7, 158}_0
c  in DIMACS:
 10178  10179  10180 -1099 -10181 0
 10178  10179  10180 -1099 -10182 0
 10178  10179  10180 -1099  10183 0

c  1+1 --> 2
c    (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0 ∧  p_1099) -> (-b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0)
c  in CNF:
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_2
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨  b^{7, 158}_1
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ -p_1099 ∨ -b^{7, 158}_0
c  in DIMACS:
 10178  10179 -10180 -1099 -10181 0
 10178  10179 -10180 -1099  10182 0
 10178  10179 -10180 -1099 -10183 0

c  2+1 --> break 
c    (-b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧  p_1099) -> break
c  in CNF:
c     b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ -p_1099 ∨ break
c  in DIMACS:
 10178 -10179  10180 -1099 1162 0


c  2-1 --> 1
c    (-b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧ -p_1099) -> (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0)
c  in CNF:
c     b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_2
c     b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_1
c     b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨  b^{7, 158}_0
c  in DIMACS:
 10178 -10179  10180  1099 -10181 0
 10178 -10179  10180  1099 -10182 0
 10178 -10179  10180  1099  10183 0

c  1-1 --> 0
c    (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0 ∧ -p_1099) -> (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧ -b^{7, 158}_0)
c  in CNF:
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_2
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_1
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_0
c  in DIMACS:
 10178  10179 -10180  1099 -10181 0
 10178  10179 -10180  1099 -10182 0
 10178  10179 -10180  1099 -10183 0

c  0-1 --> -1
c    (-b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧ -p_1099) -> ( b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0)
c  in CNF:
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨  b^{7, 158}_2
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_1
c     b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨  b^{7, 158}_0
c  in DIMACS:
 10178  10179  10180  1099  10181 0
 10178  10179  10180  1099 -10182 0
 10178  10179  10180  1099  10183 0

c  -1-1 --> -2
c    ( b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧  b^{7, 157}_0 ∧ -p_1099) -> ( b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0)
c  in CNF:
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨  b^{7, 158}_2
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨  b^{7, 158}_1
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨  p_1099 ∨ -b^{7, 158}_0
c  in DIMACS:
-10178  10179 -10180  1099  10181 0
-10178  10179 -10180  1099  10182 0
-10178  10179 -10180  1099 -10183 0

c  -2-1 --> break 
c    ( b^{7, 157}_2 ∧  b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧ -p_1099) -> break
c  in CNF:
c    -b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨  b^{7, 157}_0 ∨  p_1099 ∨ break
c  in DIMACS:
-10178 -10179  10180  1099 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 157}_2 ∧ -b^{7, 157}_1 ∧ -b^{7, 157}_0 ∧ true) 
c  in CNF:
c    -b^{7, 157}_2 ∨  b^{7, 157}_1 ∨  b^{7, 157}_0 ∨ false 
c  in DIMACS:
-10178  10179  10180  0

c  3 does not represent an automaton state.
c    -(-b^{7, 157}_2 ∧  b^{7, 157}_1 ∧  b^{7, 157}_0 ∧ true) 
c  in CNF:
c     b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ false 
c  in DIMACS:
 10178 -10179 -10180  0
c  -3 does not represent an automaton state.
c    -( b^{7, 157}_2 ∧  b^{7, 157}_1 ∧  b^{7, 157}_0 ∧ true) 
c  in CNF:
c    -b^{7, 157}_2 ∨ -b^{7, 157}_1 ∨ -b^{7, 157}_0 ∨ false 
c  in DIMACS:
-10178 -10179 -10180  0

c i = 158
c  -2+1 --> -1
c    ( b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧  p_1106) -> ( b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0)
c  in CNF:
c    -b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨  b^{7, 159}_2
c    -b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_1
c    -b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨  b^{7, 159}_0
c  in DIMACS:
-10181 -10182  10183 -1106  10184 0
-10181 -10182  10183 -1106 -10185 0
-10181 -10182  10183 -1106  10186 0

c  -1+1 --> 0
c    ( b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0 ∧  p_1106) -> (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧ -b^{7, 159}_0)
c  in CNF:
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_2
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_1
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_0
c  in DIMACS:
-10181  10182 -10183 -1106 -10184 0
-10181  10182 -10183 -1106 -10185 0
-10181  10182 -10183 -1106 -10186 0

c  0+1 --> 1
c    (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧  p_1106) -> (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0)
c  in CNF:
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_2
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_1
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨  b^{7, 159}_0
c  in DIMACS:
 10181  10182  10183 -1106 -10184 0
 10181  10182  10183 -1106 -10185 0
 10181  10182  10183 -1106  10186 0

c  1+1 --> 2
c    (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0 ∧  p_1106) -> (-b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0)
c  in CNF:
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_2
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨  b^{7, 159}_1
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ -p_1106 ∨ -b^{7, 159}_0
c  in DIMACS:
 10181  10182 -10183 -1106 -10184 0
 10181  10182 -10183 -1106  10185 0
 10181  10182 -10183 -1106 -10186 0

c  2+1 --> break 
c    (-b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 10181 -10182  10183 -1106 1162 0


c  2-1 --> 1
c    (-b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧ -p_1106) -> (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0)
c  in CNF:
c     b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_2
c     b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_1
c     b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨  b^{7, 159}_0
c  in DIMACS:
 10181 -10182  10183  1106 -10184 0
 10181 -10182  10183  1106 -10185 0
 10181 -10182  10183  1106  10186 0

c  1-1 --> 0
c    (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0 ∧ -p_1106) -> (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧ -b^{7, 159}_0)
c  in CNF:
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_2
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_1
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_0
c  in DIMACS:
 10181  10182 -10183  1106 -10184 0
 10181  10182 -10183  1106 -10185 0
 10181  10182 -10183  1106 -10186 0

c  0-1 --> -1
c    (-b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧ -p_1106) -> ( b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0)
c  in CNF:
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨  b^{7, 159}_2
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_1
c     b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨  b^{7, 159}_0
c  in DIMACS:
 10181  10182  10183  1106  10184 0
 10181  10182  10183  1106 -10185 0
 10181  10182  10183  1106  10186 0

c  -1-1 --> -2
c    ( b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧  b^{7, 158}_0 ∧ -p_1106) -> ( b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0)
c  in CNF:
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨  b^{7, 159}_2
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨  b^{7, 159}_1
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨  p_1106 ∨ -b^{7, 159}_0
c  in DIMACS:
-10181  10182 -10183  1106  10184 0
-10181  10182 -10183  1106  10185 0
-10181  10182 -10183  1106 -10186 0

c  -2-1 --> break 
c    ( b^{7, 158}_2 ∧  b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨  b^{7, 158}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-10181 -10182  10183  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 158}_2 ∧ -b^{7, 158}_1 ∧ -b^{7, 158}_0 ∧ true) 
c  in CNF:
c    -b^{7, 158}_2 ∨  b^{7, 158}_1 ∨  b^{7, 158}_0 ∨ false 
c  in DIMACS:
-10181  10182  10183  0

c  3 does not represent an automaton state.
c    -(-b^{7, 158}_2 ∧  b^{7, 158}_1 ∧  b^{7, 158}_0 ∧ true) 
c  in CNF:
c     b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ false 
c  in DIMACS:
 10181 -10182 -10183  0
c  -3 does not represent an automaton state.
c    -( b^{7, 158}_2 ∧  b^{7, 158}_1 ∧  b^{7, 158}_0 ∧ true) 
c  in CNF:
c    -b^{7, 158}_2 ∨ -b^{7, 158}_1 ∨ -b^{7, 158}_0 ∨ false 
c  in DIMACS:
-10181 -10182 -10183  0

c i = 159
c  -2+1 --> -1
c    ( b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧  p_1113) -> ( b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0)
c  in CNF:
c    -b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨  b^{7, 160}_2
c    -b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_1
c    -b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨  b^{7, 160}_0
c  in DIMACS:
-10184 -10185  10186 -1113  10187 0
-10184 -10185  10186 -1113 -10188 0
-10184 -10185  10186 -1113  10189 0

c  -1+1 --> 0
c    ( b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0 ∧  p_1113) -> (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧ -b^{7, 160}_0)
c  in CNF:
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_2
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_1
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_0
c  in DIMACS:
-10184  10185 -10186 -1113 -10187 0
-10184  10185 -10186 -1113 -10188 0
-10184  10185 -10186 -1113 -10189 0

c  0+1 --> 1
c    (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧  p_1113) -> (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0)
c  in CNF:
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_2
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_1
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨  b^{7, 160}_0
c  in DIMACS:
 10184  10185  10186 -1113 -10187 0
 10184  10185  10186 -1113 -10188 0
 10184  10185  10186 -1113  10189 0

c  1+1 --> 2
c    (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0 ∧  p_1113) -> (-b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0)
c  in CNF:
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_2
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨  b^{7, 160}_1
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ -p_1113 ∨ -b^{7, 160}_0
c  in DIMACS:
 10184  10185 -10186 -1113 -10187 0
 10184  10185 -10186 -1113  10188 0
 10184  10185 -10186 -1113 -10189 0

c  2+1 --> break 
c    (-b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 10184 -10185  10186 -1113 1162 0


c  2-1 --> 1
c    (-b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧ -p_1113) -> (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0)
c  in CNF:
c     b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_2
c     b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_1
c     b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨  b^{7, 160}_0
c  in DIMACS:
 10184 -10185  10186  1113 -10187 0
 10184 -10185  10186  1113 -10188 0
 10184 -10185  10186  1113  10189 0

c  1-1 --> 0
c    (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0 ∧ -p_1113) -> (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧ -b^{7, 160}_0)
c  in CNF:
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_2
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_1
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_0
c  in DIMACS:
 10184  10185 -10186  1113 -10187 0
 10184  10185 -10186  1113 -10188 0
 10184  10185 -10186  1113 -10189 0

c  0-1 --> -1
c    (-b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧ -p_1113) -> ( b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0)
c  in CNF:
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨  b^{7, 160}_2
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_1
c     b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨  b^{7, 160}_0
c  in DIMACS:
 10184  10185  10186  1113  10187 0
 10184  10185  10186  1113 -10188 0
 10184  10185  10186  1113  10189 0

c  -1-1 --> -2
c    ( b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧  b^{7, 159}_0 ∧ -p_1113) -> ( b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0)
c  in CNF:
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨  b^{7, 160}_2
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨  b^{7, 160}_1
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨  p_1113 ∨ -b^{7, 160}_0
c  in DIMACS:
-10184  10185 -10186  1113  10187 0
-10184  10185 -10186  1113  10188 0
-10184  10185 -10186  1113 -10189 0

c  -2-1 --> break 
c    ( b^{7, 159}_2 ∧  b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨  b^{7, 159}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-10184 -10185  10186  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 159}_2 ∧ -b^{7, 159}_1 ∧ -b^{7, 159}_0 ∧ true) 
c  in CNF:
c    -b^{7, 159}_2 ∨  b^{7, 159}_1 ∨  b^{7, 159}_0 ∨ false 
c  in DIMACS:
-10184  10185  10186  0

c  3 does not represent an automaton state.
c    -(-b^{7, 159}_2 ∧  b^{7, 159}_1 ∧  b^{7, 159}_0 ∧ true) 
c  in CNF:
c     b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ false 
c  in DIMACS:
 10184 -10185 -10186  0
c  -3 does not represent an automaton state.
c    -( b^{7, 159}_2 ∧  b^{7, 159}_1 ∧  b^{7, 159}_0 ∧ true) 
c  in CNF:
c    -b^{7, 159}_2 ∨ -b^{7, 159}_1 ∨ -b^{7, 159}_0 ∨ false 
c  in DIMACS:
-10184 -10185 -10186  0

c i = 160
c  -2+1 --> -1
c    ( b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧  p_1120) -> ( b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0)
c  in CNF:
c    -b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨  b^{7, 161}_2
c    -b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_1
c    -b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨  b^{7, 161}_0
c  in DIMACS:
-10187 -10188  10189 -1120  10190 0
-10187 -10188  10189 -1120 -10191 0
-10187 -10188  10189 -1120  10192 0

c  -1+1 --> 0
c    ( b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0 ∧  p_1120) -> (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧ -b^{7, 161}_0)
c  in CNF:
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_2
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_1
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_0
c  in DIMACS:
-10187  10188 -10189 -1120 -10190 0
-10187  10188 -10189 -1120 -10191 0
-10187  10188 -10189 -1120 -10192 0

c  0+1 --> 1
c    (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧  p_1120) -> (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0)
c  in CNF:
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_2
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_1
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨  b^{7, 161}_0
c  in DIMACS:
 10187  10188  10189 -1120 -10190 0
 10187  10188  10189 -1120 -10191 0
 10187  10188  10189 -1120  10192 0

c  1+1 --> 2
c    (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0 ∧  p_1120) -> (-b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0)
c  in CNF:
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_2
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨  b^{7, 161}_1
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ -p_1120 ∨ -b^{7, 161}_0
c  in DIMACS:
 10187  10188 -10189 -1120 -10190 0
 10187  10188 -10189 -1120  10191 0
 10187  10188 -10189 -1120 -10192 0

c  2+1 --> break 
c    (-b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 10187 -10188  10189 -1120 1162 0


c  2-1 --> 1
c    (-b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧ -p_1120) -> (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0)
c  in CNF:
c     b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_2
c     b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_1
c     b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨  b^{7, 161}_0
c  in DIMACS:
 10187 -10188  10189  1120 -10190 0
 10187 -10188  10189  1120 -10191 0
 10187 -10188  10189  1120  10192 0

c  1-1 --> 0
c    (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0 ∧ -p_1120) -> (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧ -b^{7, 161}_0)
c  in CNF:
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_2
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_1
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_0
c  in DIMACS:
 10187  10188 -10189  1120 -10190 0
 10187  10188 -10189  1120 -10191 0
 10187  10188 -10189  1120 -10192 0

c  0-1 --> -1
c    (-b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧ -p_1120) -> ( b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0)
c  in CNF:
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨  b^{7, 161}_2
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_1
c     b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨  b^{7, 161}_0
c  in DIMACS:
 10187  10188  10189  1120  10190 0
 10187  10188  10189  1120 -10191 0
 10187  10188  10189  1120  10192 0

c  -1-1 --> -2
c    ( b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧  b^{7, 160}_0 ∧ -p_1120) -> ( b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0)
c  in CNF:
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨  b^{7, 161}_2
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨  b^{7, 161}_1
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨  p_1120 ∨ -b^{7, 161}_0
c  in DIMACS:
-10187  10188 -10189  1120  10190 0
-10187  10188 -10189  1120  10191 0
-10187  10188 -10189  1120 -10192 0

c  -2-1 --> break 
c    ( b^{7, 160}_2 ∧  b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨  b^{7, 160}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-10187 -10188  10189  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 160}_2 ∧ -b^{7, 160}_1 ∧ -b^{7, 160}_0 ∧ true) 
c  in CNF:
c    -b^{7, 160}_2 ∨  b^{7, 160}_1 ∨  b^{7, 160}_0 ∨ false 
c  in DIMACS:
-10187  10188  10189  0

c  3 does not represent an automaton state.
c    -(-b^{7, 160}_2 ∧  b^{7, 160}_1 ∧  b^{7, 160}_0 ∧ true) 
c  in CNF:
c     b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ false 
c  in DIMACS:
 10187 -10188 -10189  0
c  -3 does not represent an automaton state.
c    -( b^{7, 160}_2 ∧  b^{7, 160}_1 ∧  b^{7, 160}_0 ∧ true) 
c  in CNF:
c    -b^{7, 160}_2 ∨ -b^{7, 160}_1 ∨ -b^{7, 160}_0 ∨ false 
c  in DIMACS:
-10187 -10188 -10189  0

c i = 161
c  -2+1 --> -1
c    ( b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧  p_1127) -> ( b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0)
c  in CNF:
c    -b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨  b^{7, 162}_2
c    -b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_1
c    -b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨  b^{7, 162}_0
c  in DIMACS:
-10190 -10191  10192 -1127  10193 0
-10190 -10191  10192 -1127 -10194 0
-10190 -10191  10192 -1127  10195 0

c  -1+1 --> 0
c    ( b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0 ∧  p_1127) -> (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧ -b^{7, 162}_0)
c  in CNF:
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_2
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_1
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_0
c  in DIMACS:
-10190  10191 -10192 -1127 -10193 0
-10190  10191 -10192 -1127 -10194 0
-10190  10191 -10192 -1127 -10195 0

c  0+1 --> 1
c    (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧  p_1127) -> (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0)
c  in CNF:
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_2
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_1
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨  b^{7, 162}_0
c  in DIMACS:
 10190  10191  10192 -1127 -10193 0
 10190  10191  10192 -1127 -10194 0
 10190  10191  10192 -1127  10195 0

c  1+1 --> 2
c    (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0 ∧  p_1127) -> (-b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0)
c  in CNF:
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_2
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨  b^{7, 162}_1
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ -p_1127 ∨ -b^{7, 162}_0
c  in DIMACS:
 10190  10191 -10192 -1127 -10193 0
 10190  10191 -10192 -1127  10194 0
 10190  10191 -10192 -1127 -10195 0

c  2+1 --> break 
c    (-b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧  p_1127) -> break
c  in CNF:
c     b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ -p_1127 ∨ break
c  in DIMACS:
 10190 -10191  10192 -1127 1162 0


c  2-1 --> 1
c    (-b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧ -p_1127) -> (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0)
c  in CNF:
c     b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_2
c     b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_1
c     b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨  b^{7, 162}_0
c  in DIMACS:
 10190 -10191  10192  1127 -10193 0
 10190 -10191  10192  1127 -10194 0
 10190 -10191  10192  1127  10195 0

c  1-1 --> 0
c    (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0 ∧ -p_1127) -> (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧ -b^{7, 162}_0)
c  in CNF:
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_2
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_1
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_0
c  in DIMACS:
 10190  10191 -10192  1127 -10193 0
 10190  10191 -10192  1127 -10194 0
 10190  10191 -10192  1127 -10195 0

c  0-1 --> -1
c    (-b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧ -p_1127) -> ( b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0)
c  in CNF:
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨  b^{7, 162}_2
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_1
c     b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨  b^{7, 162}_0
c  in DIMACS:
 10190  10191  10192  1127  10193 0
 10190  10191  10192  1127 -10194 0
 10190  10191  10192  1127  10195 0

c  -1-1 --> -2
c    ( b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧  b^{7, 161}_0 ∧ -p_1127) -> ( b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0)
c  in CNF:
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨  b^{7, 162}_2
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨  b^{7, 162}_1
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨  p_1127 ∨ -b^{7, 162}_0
c  in DIMACS:
-10190  10191 -10192  1127  10193 0
-10190  10191 -10192  1127  10194 0
-10190  10191 -10192  1127 -10195 0

c  -2-1 --> break 
c    ( b^{7, 161}_2 ∧  b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧ -p_1127) -> break
c  in CNF:
c    -b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨  b^{7, 161}_0 ∨  p_1127 ∨ break
c  in DIMACS:
-10190 -10191  10192  1127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 161}_2 ∧ -b^{7, 161}_1 ∧ -b^{7, 161}_0 ∧ true) 
c  in CNF:
c    -b^{7, 161}_2 ∨  b^{7, 161}_1 ∨  b^{7, 161}_0 ∨ false 
c  in DIMACS:
-10190  10191  10192  0

c  3 does not represent an automaton state.
c    -(-b^{7, 161}_2 ∧  b^{7, 161}_1 ∧  b^{7, 161}_0 ∧ true) 
c  in CNF:
c     b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ false 
c  in DIMACS:
 10190 -10191 -10192  0
c  -3 does not represent an automaton state.
c    -( b^{7, 161}_2 ∧  b^{7, 161}_1 ∧  b^{7, 161}_0 ∧ true) 
c  in CNF:
c    -b^{7, 161}_2 ∨ -b^{7, 161}_1 ∨ -b^{7, 161}_0 ∨ false 
c  in DIMACS:
-10190 -10191 -10192  0

c i = 162
c  -2+1 --> -1
c    ( b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧  p_1134) -> ( b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0)
c  in CNF:
c    -b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨  b^{7, 163}_2
c    -b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_1
c    -b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨  b^{7, 163}_0
c  in DIMACS:
-10193 -10194  10195 -1134  10196 0
-10193 -10194  10195 -1134 -10197 0
-10193 -10194  10195 -1134  10198 0

c  -1+1 --> 0
c    ( b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0 ∧  p_1134) -> (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧ -b^{7, 163}_0)
c  in CNF:
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_2
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_1
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_0
c  in DIMACS:
-10193  10194 -10195 -1134 -10196 0
-10193  10194 -10195 -1134 -10197 0
-10193  10194 -10195 -1134 -10198 0

c  0+1 --> 1
c    (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧  p_1134) -> (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0)
c  in CNF:
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_2
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_1
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨  b^{7, 163}_0
c  in DIMACS:
 10193  10194  10195 -1134 -10196 0
 10193  10194  10195 -1134 -10197 0
 10193  10194  10195 -1134  10198 0

c  1+1 --> 2
c    (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0 ∧  p_1134) -> (-b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0)
c  in CNF:
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_2
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨  b^{7, 163}_1
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ -p_1134 ∨ -b^{7, 163}_0
c  in DIMACS:
 10193  10194 -10195 -1134 -10196 0
 10193  10194 -10195 -1134  10197 0
 10193  10194 -10195 -1134 -10198 0

c  2+1 --> break 
c    (-b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 10193 -10194  10195 -1134 1162 0


c  2-1 --> 1
c    (-b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧ -p_1134) -> (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0)
c  in CNF:
c     b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_2
c     b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_1
c     b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨  b^{7, 163}_0
c  in DIMACS:
 10193 -10194  10195  1134 -10196 0
 10193 -10194  10195  1134 -10197 0
 10193 -10194  10195  1134  10198 0

c  1-1 --> 0
c    (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0 ∧ -p_1134) -> (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧ -b^{7, 163}_0)
c  in CNF:
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_2
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_1
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_0
c  in DIMACS:
 10193  10194 -10195  1134 -10196 0
 10193  10194 -10195  1134 -10197 0
 10193  10194 -10195  1134 -10198 0

c  0-1 --> -1
c    (-b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧ -p_1134) -> ( b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0)
c  in CNF:
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨  b^{7, 163}_2
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_1
c     b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨  b^{7, 163}_0
c  in DIMACS:
 10193  10194  10195  1134  10196 0
 10193  10194  10195  1134 -10197 0
 10193  10194  10195  1134  10198 0

c  -1-1 --> -2
c    ( b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧  b^{7, 162}_0 ∧ -p_1134) -> ( b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0)
c  in CNF:
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨  b^{7, 163}_2
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨  b^{7, 163}_1
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨  p_1134 ∨ -b^{7, 163}_0
c  in DIMACS:
-10193  10194 -10195  1134  10196 0
-10193  10194 -10195  1134  10197 0
-10193  10194 -10195  1134 -10198 0

c  -2-1 --> break 
c    ( b^{7, 162}_2 ∧  b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨  b^{7, 162}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-10193 -10194  10195  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 162}_2 ∧ -b^{7, 162}_1 ∧ -b^{7, 162}_0 ∧ true) 
c  in CNF:
c    -b^{7, 162}_2 ∨  b^{7, 162}_1 ∨  b^{7, 162}_0 ∨ false 
c  in DIMACS:
-10193  10194  10195  0

c  3 does not represent an automaton state.
c    -(-b^{7, 162}_2 ∧  b^{7, 162}_1 ∧  b^{7, 162}_0 ∧ true) 
c  in CNF:
c     b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ false 
c  in DIMACS:
 10193 -10194 -10195  0
c  -3 does not represent an automaton state.
c    -( b^{7, 162}_2 ∧  b^{7, 162}_1 ∧  b^{7, 162}_0 ∧ true) 
c  in CNF:
c    -b^{7, 162}_2 ∨ -b^{7, 162}_1 ∨ -b^{7, 162}_0 ∨ false 
c  in DIMACS:
-10193 -10194 -10195  0

c i = 163
c  -2+1 --> -1
c    ( b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧  p_1141) -> ( b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0)
c  in CNF:
c    -b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨  b^{7, 164}_2
c    -b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_1
c    -b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨  b^{7, 164}_0
c  in DIMACS:
-10196 -10197  10198 -1141  10199 0
-10196 -10197  10198 -1141 -10200 0
-10196 -10197  10198 -1141  10201 0

c  -1+1 --> 0
c    ( b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0 ∧  p_1141) -> (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧ -b^{7, 164}_0)
c  in CNF:
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_2
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_1
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_0
c  in DIMACS:
-10196  10197 -10198 -1141 -10199 0
-10196  10197 -10198 -1141 -10200 0
-10196  10197 -10198 -1141 -10201 0

c  0+1 --> 1
c    (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧  p_1141) -> (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0)
c  in CNF:
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_2
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_1
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨  b^{7, 164}_0
c  in DIMACS:
 10196  10197  10198 -1141 -10199 0
 10196  10197  10198 -1141 -10200 0
 10196  10197  10198 -1141  10201 0

c  1+1 --> 2
c    (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0 ∧  p_1141) -> (-b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0)
c  in CNF:
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_2
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨  b^{7, 164}_1
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ -p_1141 ∨ -b^{7, 164}_0
c  in DIMACS:
 10196  10197 -10198 -1141 -10199 0
 10196  10197 -10198 -1141  10200 0
 10196  10197 -10198 -1141 -10201 0

c  2+1 --> break 
c    (-b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧  p_1141) -> break
c  in CNF:
c     b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ -p_1141 ∨ break
c  in DIMACS:
 10196 -10197  10198 -1141 1162 0


c  2-1 --> 1
c    (-b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧ -p_1141) -> (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0)
c  in CNF:
c     b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_2
c     b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_1
c     b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨  b^{7, 164}_0
c  in DIMACS:
 10196 -10197  10198  1141 -10199 0
 10196 -10197  10198  1141 -10200 0
 10196 -10197  10198  1141  10201 0

c  1-1 --> 0
c    (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0 ∧ -p_1141) -> (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧ -b^{7, 164}_0)
c  in CNF:
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_2
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_1
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_0
c  in DIMACS:
 10196  10197 -10198  1141 -10199 0
 10196  10197 -10198  1141 -10200 0
 10196  10197 -10198  1141 -10201 0

c  0-1 --> -1
c    (-b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧ -p_1141) -> ( b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0)
c  in CNF:
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨  b^{7, 164}_2
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_1
c     b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨  b^{7, 164}_0
c  in DIMACS:
 10196  10197  10198  1141  10199 0
 10196  10197  10198  1141 -10200 0
 10196  10197  10198  1141  10201 0

c  -1-1 --> -2
c    ( b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧  b^{7, 163}_0 ∧ -p_1141) -> ( b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0)
c  in CNF:
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨  b^{7, 164}_2
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨  b^{7, 164}_1
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨  p_1141 ∨ -b^{7, 164}_0
c  in DIMACS:
-10196  10197 -10198  1141  10199 0
-10196  10197 -10198  1141  10200 0
-10196  10197 -10198  1141 -10201 0

c  -2-1 --> break 
c    ( b^{7, 163}_2 ∧  b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧ -p_1141) -> break
c  in CNF:
c    -b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨  b^{7, 163}_0 ∨  p_1141 ∨ break
c  in DIMACS:
-10196 -10197  10198  1141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 163}_2 ∧ -b^{7, 163}_1 ∧ -b^{7, 163}_0 ∧ true) 
c  in CNF:
c    -b^{7, 163}_2 ∨  b^{7, 163}_1 ∨  b^{7, 163}_0 ∨ false 
c  in DIMACS:
-10196  10197  10198  0

c  3 does not represent an automaton state.
c    -(-b^{7, 163}_2 ∧  b^{7, 163}_1 ∧  b^{7, 163}_0 ∧ true) 
c  in CNF:
c     b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ false 
c  in DIMACS:
 10196 -10197 -10198  0
c  -3 does not represent an automaton state.
c    -( b^{7, 163}_2 ∧  b^{7, 163}_1 ∧  b^{7, 163}_0 ∧ true) 
c  in CNF:
c    -b^{7, 163}_2 ∨ -b^{7, 163}_1 ∨ -b^{7, 163}_0 ∨ false 
c  in DIMACS:
-10196 -10197 -10198  0

c i = 164
c  -2+1 --> -1
c    ( b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧  p_1148) -> ( b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0)
c  in CNF:
c    -b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨  b^{7, 165}_2
c    -b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_1
c    -b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨  b^{7, 165}_0
c  in DIMACS:
-10199 -10200  10201 -1148  10202 0
-10199 -10200  10201 -1148 -10203 0
-10199 -10200  10201 -1148  10204 0

c  -1+1 --> 0
c    ( b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0 ∧  p_1148) -> (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧ -b^{7, 165}_0)
c  in CNF:
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_2
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_1
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_0
c  in DIMACS:
-10199  10200 -10201 -1148 -10202 0
-10199  10200 -10201 -1148 -10203 0
-10199  10200 -10201 -1148 -10204 0

c  0+1 --> 1
c    (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧  p_1148) -> (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0)
c  in CNF:
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_2
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_1
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨  b^{7, 165}_0
c  in DIMACS:
 10199  10200  10201 -1148 -10202 0
 10199  10200  10201 -1148 -10203 0
 10199  10200  10201 -1148  10204 0

c  1+1 --> 2
c    (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0 ∧  p_1148) -> (-b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0)
c  in CNF:
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_2
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨  b^{7, 165}_1
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ -p_1148 ∨ -b^{7, 165}_0
c  in DIMACS:
 10199  10200 -10201 -1148 -10202 0
 10199  10200 -10201 -1148  10203 0
 10199  10200 -10201 -1148 -10204 0

c  2+1 --> break 
c    (-b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 10199 -10200  10201 -1148 1162 0


c  2-1 --> 1
c    (-b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧ -p_1148) -> (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0)
c  in CNF:
c     b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_2
c     b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_1
c     b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨  b^{7, 165}_0
c  in DIMACS:
 10199 -10200  10201  1148 -10202 0
 10199 -10200  10201  1148 -10203 0
 10199 -10200  10201  1148  10204 0

c  1-1 --> 0
c    (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0 ∧ -p_1148) -> (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧ -b^{7, 165}_0)
c  in CNF:
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_2
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_1
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_0
c  in DIMACS:
 10199  10200 -10201  1148 -10202 0
 10199  10200 -10201  1148 -10203 0
 10199  10200 -10201  1148 -10204 0

c  0-1 --> -1
c    (-b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧ -p_1148) -> ( b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0)
c  in CNF:
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨  b^{7, 165}_2
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_1
c     b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨  b^{7, 165}_0
c  in DIMACS:
 10199  10200  10201  1148  10202 0
 10199  10200  10201  1148 -10203 0
 10199  10200  10201  1148  10204 0

c  -1-1 --> -2
c    ( b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧  b^{7, 164}_0 ∧ -p_1148) -> ( b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0)
c  in CNF:
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨  b^{7, 165}_2
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨  b^{7, 165}_1
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨  p_1148 ∨ -b^{7, 165}_0
c  in DIMACS:
-10199  10200 -10201  1148  10202 0
-10199  10200 -10201  1148  10203 0
-10199  10200 -10201  1148 -10204 0

c  -2-1 --> break 
c    ( b^{7, 164}_2 ∧  b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨  b^{7, 164}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-10199 -10200  10201  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 164}_2 ∧ -b^{7, 164}_1 ∧ -b^{7, 164}_0 ∧ true) 
c  in CNF:
c    -b^{7, 164}_2 ∨  b^{7, 164}_1 ∨  b^{7, 164}_0 ∨ false 
c  in DIMACS:
-10199  10200  10201  0

c  3 does not represent an automaton state.
c    -(-b^{7, 164}_2 ∧  b^{7, 164}_1 ∧  b^{7, 164}_0 ∧ true) 
c  in CNF:
c     b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ false 
c  in DIMACS:
 10199 -10200 -10201  0
c  -3 does not represent an automaton state.
c    -( b^{7, 164}_2 ∧  b^{7, 164}_1 ∧  b^{7, 164}_0 ∧ true) 
c  in CNF:
c    -b^{7, 164}_2 ∨ -b^{7, 164}_1 ∨ -b^{7, 164}_0 ∨ false 
c  in DIMACS:
-10199 -10200 -10201  0

c i = 165
c  -2+1 --> -1
c    ( b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧  p_1155) -> ( b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧  b^{7, 166}_0)
c  in CNF:
c    -b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨  b^{7, 166}_2
c    -b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_1
c    -b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨  b^{7, 166}_0
c  in DIMACS:
-10202 -10203  10204 -1155  10205 0
-10202 -10203  10204 -1155 -10206 0
-10202 -10203  10204 -1155  10207 0

c  -1+1 --> 0
c    ( b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0 ∧  p_1155) -> (-b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧ -b^{7, 166}_0)
c  in CNF:
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_2
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_1
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_0
c  in DIMACS:
-10202  10203 -10204 -1155 -10205 0
-10202  10203 -10204 -1155 -10206 0
-10202  10203 -10204 -1155 -10207 0

c  0+1 --> 1
c    (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧  p_1155) -> (-b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧  b^{7, 166}_0)
c  in CNF:
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_2
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_1
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨  b^{7, 166}_0
c  in DIMACS:
 10202  10203  10204 -1155 -10205 0
 10202  10203  10204 -1155 -10206 0
 10202  10203  10204 -1155  10207 0

c  1+1 --> 2
c    (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0 ∧  p_1155) -> (-b^{7, 166}_2 ∧  b^{7, 166}_1 ∧ -b^{7, 166}_0)
c  in CNF:
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_2
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨  b^{7, 166}_1
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ -p_1155 ∨ -b^{7, 166}_0
c  in DIMACS:
 10202  10203 -10204 -1155 -10205 0
 10202  10203 -10204 -1155  10206 0
 10202  10203 -10204 -1155 -10207 0

c  2+1 --> break 
c    (-b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 10202 -10203  10204 -1155 1162 0


c  2-1 --> 1
c    (-b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧ -p_1155) -> (-b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧  b^{7, 166}_0)
c  in CNF:
c     b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_2
c     b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_1
c     b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨  b^{7, 166}_0
c  in DIMACS:
 10202 -10203  10204  1155 -10205 0
 10202 -10203  10204  1155 -10206 0
 10202 -10203  10204  1155  10207 0

c  1-1 --> 0
c    (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0 ∧ -p_1155) -> (-b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧ -b^{7, 166}_0)
c  in CNF:
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_2
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_1
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_0
c  in DIMACS:
 10202  10203 -10204  1155 -10205 0
 10202  10203 -10204  1155 -10206 0
 10202  10203 -10204  1155 -10207 0

c  0-1 --> -1
c    (-b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧ -p_1155) -> ( b^{7, 166}_2 ∧ -b^{7, 166}_1 ∧  b^{7, 166}_0)
c  in CNF:
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨  b^{7, 166}_2
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_1
c     b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨  b^{7, 166}_0
c  in DIMACS:
 10202  10203  10204  1155  10205 0
 10202  10203  10204  1155 -10206 0
 10202  10203  10204  1155  10207 0

c  -1-1 --> -2
c    ( b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧  b^{7, 165}_0 ∧ -p_1155) -> ( b^{7, 166}_2 ∧  b^{7, 166}_1 ∧ -b^{7, 166}_0)
c  in CNF:
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨  b^{7, 166}_2
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨  b^{7, 166}_1
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨  p_1155 ∨ -b^{7, 166}_0
c  in DIMACS:
-10202  10203 -10204  1155  10205 0
-10202  10203 -10204  1155  10206 0
-10202  10203 -10204  1155 -10207 0

c  -2-1 --> break 
c    ( b^{7, 165}_2 ∧  b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨  b^{7, 165}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-10202 -10203  10204  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{7, 165}_2 ∧ -b^{7, 165}_1 ∧ -b^{7, 165}_0 ∧ true) 
c  in CNF:
c    -b^{7, 165}_2 ∨  b^{7, 165}_1 ∨  b^{7, 165}_0 ∨ false 
c  in DIMACS:
-10202  10203  10204  0

c  3 does not represent an automaton state.
c    -(-b^{7, 165}_2 ∧  b^{7, 165}_1 ∧  b^{7, 165}_0 ∧ true) 
c  in CNF:
c     b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ false 
c  in DIMACS:
 10202 -10203 -10204  0
c  -3 does not represent an automaton state.
c    -( b^{7, 165}_2 ∧  b^{7, 165}_1 ∧  b^{7, 165}_0 ∧ true) 
c  in CNF:
c    -b^{7, 165}_2 ∨ -b^{7, 165}_1 ∨ -b^{7, 165}_0 ∨ false 
c  in DIMACS:
-10202 -10203 -10204  0

c INIT for k = 8
c    -b^{8, 1}_2
c    -b^{8, 1}_1
c    -b^{8, 1}_0
c  in DIMACS:
-10208 0
-10209 0
-10210 0

c Transitions for k = 8
c i = 1
c  -2+1 --> -1
c    ( b^{8, 1}_2 ∧  b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧  p_8) -> ( b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0)
c  in CNF:
c    -b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨  b^{8, 2}_2
c    -b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_1
c    -b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨  b^{8, 2}_0
c  in DIMACS:
-10208 -10209  10210 -8  10211 0
-10208 -10209  10210 -8 -10212 0
-10208 -10209  10210 -8  10213 0

c  -1+1 --> 0
c    ( b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧  b^{8, 1}_0 ∧  p_8) -> (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧ -b^{8, 2}_0)
c  in CNF:
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_2
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_1
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_0
c  in DIMACS:
-10208  10209 -10210 -8 -10211 0
-10208  10209 -10210 -8 -10212 0
-10208  10209 -10210 -8 -10213 0

c  0+1 --> 1
c    (-b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧  p_8) -> (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0)
c  in CNF:
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_2
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_1
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨  b^{8, 2}_0
c  in DIMACS:
 10208  10209  10210 -8 -10211 0
 10208  10209  10210 -8 -10212 0
 10208  10209  10210 -8  10213 0

c  1+1 --> 2
c    (-b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧  b^{8, 1}_0 ∧  p_8) -> (-b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0)
c  in CNF:
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_2
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨  b^{8, 2}_1
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ -p_8 ∨ -b^{8, 2}_0
c  in DIMACS:
 10208  10209 -10210 -8 -10211 0
 10208  10209 -10210 -8  10212 0
 10208  10209 -10210 -8 -10213 0

c  2+1 --> break 
c    (-b^{8, 1}_2 ∧  b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧  p_8) -> break
c  in CNF:
c     b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ -p_8 ∨ break
c  in DIMACS:
 10208 -10209  10210 -8 1162 0


c  2-1 --> 1
c    (-b^{8, 1}_2 ∧  b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧ -p_8) -> (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0)
c  in CNF:
c     b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_2
c     b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_1
c     b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨  b^{8, 2}_0
c  in DIMACS:
 10208 -10209  10210  8 -10211 0
 10208 -10209  10210  8 -10212 0
 10208 -10209  10210  8  10213 0

c  1-1 --> 0
c    (-b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧  b^{8, 1}_0 ∧ -p_8) -> (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧ -b^{8, 2}_0)
c  in CNF:
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_2
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_1
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_0
c  in DIMACS:
 10208  10209 -10210  8 -10211 0
 10208  10209 -10210  8 -10212 0
 10208  10209 -10210  8 -10213 0

c  0-1 --> -1
c    (-b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧ -p_8) -> ( b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0)
c  in CNF:
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨  b^{8, 2}_2
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_1
c     b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨  b^{8, 2}_0
c  in DIMACS:
 10208  10209  10210  8  10211 0
 10208  10209  10210  8 -10212 0
 10208  10209  10210  8  10213 0

c  -1-1 --> -2
c    ( b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧  b^{8, 1}_0 ∧ -p_8) -> ( b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0)
c  in CNF:
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨  b^{8, 2}_2
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨  b^{8, 2}_1
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨  p_8 ∨ -b^{8, 2}_0
c  in DIMACS:
-10208  10209 -10210  8  10211 0
-10208  10209 -10210  8  10212 0
-10208  10209 -10210  8 -10213 0

c  -2-1 --> break 
c    ( b^{8, 1}_2 ∧  b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧ -p_8) -> break
c  in CNF:
c    -b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨  b^{8, 1}_0 ∨  p_8 ∨ break
c  in DIMACS:
-10208 -10209  10210  8 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 1}_2 ∧ -b^{8, 1}_1 ∧ -b^{8, 1}_0 ∧ true) 
c  in CNF:
c    -b^{8, 1}_2 ∨  b^{8, 1}_1 ∨  b^{8, 1}_0 ∨ false 
c  in DIMACS:
-10208  10209  10210  0

c  3 does not represent an automaton state.
c    -(-b^{8, 1}_2 ∧  b^{8, 1}_1 ∧  b^{8, 1}_0 ∧ true) 
c  in CNF:
c     b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ false 
c  in DIMACS:
 10208 -10209 -10210  0
c  -3 does not represent an automaton state.
c    -( b^{8, 1}_2 ∧  b^{8, 1}_1 ∧  b^{8, 1}_0 ∧ true) 
c  in CNF:
c    -b^{8, 1}_2 ∨ -b^{8, 1}_1 ∨ -b^{8, 1}_0 ∨ false 
c  in DIMACS:
-10208 -10209 -10210  0

c i = 2
c  -2+1 --> -1
c    ( b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧  p_16) -> ( b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0)
c  in CNF:
c    -b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨  b^{8, 3}_2
c    -b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_1
c    -b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨  b^{8, 3}_0
c  in DIMACS:
-10211 -10212  10213 -16  10214 0
-10211 -10212  10213 -16 -10215 0
-10211 -10212  10213 -16  10216 0

c  -1+1 --> 0
c    ( b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0 ∧  p_16) -> (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧ -b^{8, 3}_0)
c  in CNF:
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_2
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_1
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_0
c  in DIMACS:
-10211  10212 -10213 -16 -10214 0
-10211  10212 -10213 -16 -10215 0
-10211  10212 -10213 -16 -10216 0

c  0+1 --> 1
c    (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧  p_16) -> (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0)
c  in CNF:
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_2
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_1
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨  b^{8, 3}_0
c  in DIMACS:
 10211  10212  10213 -16 -10214 0
 10211  10212  10213 -16 -10215 0
 10211  10212  10213 -16  10216 0

c  1+1 --> 2
c    (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0 ∧  p_16) -> (-b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0)
c  in CNF:
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_2
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨  b^{8, 3}_1
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ -p_16 ∨ -b^{8, 3}_0
c  in DIMACS:
 10211  10212 -10213 -16 -10214 0
 10211  10212 -10213 -16  10215 0
 10211  10212 -10213 -16 -10216 0

c  2+1 --> break 
c    (-b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧  p_16) -> break
c  in CNF:
c     b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ -p_16 ∨ break
c  in DIMACS:
 10211 -10212  10213 -16 1162 0


c  2-1 --> 1
c    (-b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧ -p_16) -> (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0)
c  in CNF:
c     b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_2
c     b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_1
c     b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨  b^{8, 3}_0
c  in DIMACS:
 10211 -10212  10213  16 -10214 0
 10211 -10212  10213  16 -10215 0
 10211 -10212  10213  16  10216 0

c  1-1 --> 0
c    (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0 ∧ -p_16) -> (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧ -b^{8, 3}_0)
c  in CNF:
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_2
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_1
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_0
c  in DIMACS:
 10211  10212 -10213  16 -10214 0
 10211  10212 -10213  16 -10215 0
 10211  10212 -10213  16 -10216 0

c  0-1 --> -1
c    (-b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧ -p_16) -> ( b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0)
c  in CNF:
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨  b^{8, 3}_2
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_1
c     b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨  b^{8, 3}_0
c  in DIMACS:
 10211  10212  10213  16  10214 0
 10211  10212  10213  16 -10215 0
 10211  10212  10213  16  10216 0

c  -1-1 --> -2
c    ( b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧  b^{8, 2}_0 ∧ -p_16) -> ( b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0)
c  in CNF:
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨  b^{8, 3}_2
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨  b^{8, 3}_1
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨  p_16 ∨ -b^{8, 3}_0
c  in DIMACS:
-10211  10212 -10213  16  10214 0
-10211  10212 -10213  16  10215 0
-10211  10212 -10213  16 -10216 0

c  -2-1 --> break 
c    ( b^{8, 2}_2 ∧  b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧ -p_16) -> break
c  in CNF:
c    -b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨  b^{8, 2}_0 ∨  p_16 ∨ break
c  in DIMACS:
-10211 -10212  10213  16 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 2}_2 ∧ -b^{8, 2}_1 ∧ -b^{8, 2}_0 ∧ true) 
c  in CNF:
c    -b^{8, 2}_2 ∨  b^{8, 2}_1 ∨  b^{8, 2}_0 ∨ false 
c  in DIMACS:
-10211  10212  10213  0

c  3 does not represent an automaton state.
c    -(-b^{8, 2}_2 ∧  b^{8, 2}_1 ∧  b^{8, 2}_0 ∧ true) 
c  in CNF:
c     b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ false 
c  in DIMACS:
 10211 -10212 -10213  0
c  -3 does not represent an automaton state.
c    -( b^{8, 2}_2 ∧  b^{8, 2}_1 ∧  b^{8, 2}_0 ∧ true) 
c  in CNF:
c    -b^{8, 2}_2 ∨ -b^{8, 2}_1 ∨ -b^{8, 2}_0 ∨ false 
c  in DIMACS:
-10211 -10212 -10213  0

c i = 3
c  -2+1 --> -1
c    ( b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧  p_24) -> ( b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0)
c  in CNF:
c    -b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨  b^{8, 4}_2
c    -b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_1
c    -b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨  b^{8, 4}_0
c  in DIMACS:
-10214 -10215  10216 -24  10217 0
-10214 -10215  10216 -24 -10218 0
-10214 -10215  10216 -24  10219 0

c  -1+1 --> 0
c    ( b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0 ∧  p_24) -> (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧ -b^{8, 4}_0)
c  in CNF:
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_2
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_1
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_0
c  in DIMACS:
-10214  10215 -10216 -24 -10217 0
-10214  10215 -10216 -24 -10218 0
-10214  10215 -10216 -24 -10219 0

c  0+1 --> 1
c    (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧  p_24) -> (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0)
c  in CNF:
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_2
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_1
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨  b^{8, 4}_0
c  in DIMACS:
 10214  10215  10216 -24 -10217 0
 10214  10215  10216 -24 -10218 0
 10214  10215  10216 -24  10219 0

c  1+1 --> 2
c    (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0 ∧  p_24) -> (-b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0)
c  in CNF:
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_2
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨  b^{8, 4}_1
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ -p_24 ∨ -b^{8, 4}_0
c  in DIMACS:
 10214  10215 -10216 -24 -10217 0
 10214  10215 -10216 -24  10218 0
 10214  10215 -10216 -24 -10219 0

c  2+1 --> break 
c    (-b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧  p_24) -> break
c  in CNF:
c     b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 10214 -10215  10216 -24 1162 0


c  2-1 --> 1
c    (-b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧ -p_24) -> (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0)
c  in CNF:
c     b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_2
c     b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_1
c     b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨  b^{8, 4}_0
c  in DIMACS:
 10214 -10215  10216  24 -10217 0
 10214 -10215  10216  24 -10218 0
 10214 -10215  10216  24  10219 0

c  1-1 --> 0
c    (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0 ∧ -p_24) -> (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧ -b^{8, 4}_0)
c  in CNF:
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_2
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_1
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_0
c  in DIMACS:
 10214  10215 -10216  24 -10217 0
 10214  10215 -10216  24 -10218 0
 10214  10215 -10216  24 -10219 0

c  0-1 --> -1
c    (-b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧ -p_24) -> ( b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0)
c  in CNF:
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨  b^{8, 4}_2
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_1
c     b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨  b^{8, 4}_0
c  in DIMACS:
 10214  10215  10216  24  10217 0
 10214  10215  10216  24 -10218 0
 10214  10215  10216  24  10219 0

c  -1-1 --> -2
c    ( b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧  b^{8, 3}_0 ∧ -p_24) -> ( b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0)
c  in CNF:
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨  b^{8, 4}_2
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨  b^{8, 4}_1
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨  p_24 ∨ -b^{8, 4}_0
c  in DIMACS:
-10214  10215 -10216  24  10217 0
-10214  10215 -10216  24  10218 0
-10214  10215 -10216  24 -10219 0

c  -2-1 --> break 
c    ( b^{8, 3}_2 ∧  b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨  b^{8, 3}_0 ∨  p_24 ∨ break
c  in DIMACS:
-10214 -10215  10216  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 3}_2 ∧ -b^{8, 3}_1 ∧ -b^{8, 3}_0 ∧ true) 
c  in CNF:
c    -b^{8, 3}_2 ∨  b^{8, 3}_1 ∨  b^{8, 3}_0 ∨ false 
c  in DIMACS:
-10214  10215  10216  0

c  3 does not represent an automaton state.
c    -(-b^{8, 3}_2 ∧  b^{8, 3}_1 ∧  b^{8, 3}_0 ∧ true) 
c  in CNF:
c     b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ false 
c  in DIMACS:
 10214 -10215 -10216  0
c  -3 does not represent an automaton state.
c    -( b^{8, 3}_2 ∧  b^{8, 3}_1 ∧  b^{8, 3}_0 ∧ true) 
c  in CNF:
c    -b^{8, 3}_2 ∨ -b^{8, 3}_1 ∨ -b^{8, 3}_0 ∨ false 
c  in DIMACS:
-10214 -10215 -10216  0

c i = 4
c  -2+1 --> -1
c    ( b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧  p_32) -> ( b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0)
c  in CNF:
c    -b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨  b^{8, 5}_2
c    -b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_1
c    -b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨  b^{8, 5}_0
c  in DIMACS:
-10217 -10218  10219 -32  10220 0
-10217 -10218  10219 -32 -10221 0
-10217 -10218  10219 -32  10222 0

c  -1+1 --> 0
c    ( b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0 ∧  p_32) -> (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧ -b^{8, 5}_0)
c  in CNF:
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_2
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_1
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_0
c  in DIMACS:
-10217  10218 -10219 -32 -10220 0
-10217  10218 -10219 -32 -10221 0
-10217  10218 -10219 -32 -10222 0

c  0+1 --> 1
c    (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧  p_32) -> (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0)
c  in CNF:
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_2
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_1
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨  b^{8, 5}_0
c  in DIMACS:
 10217  10218  10219 -32 -10220 0
 10217  10218  10219 -32 -10221 0
 10217  10218  10219 -32  10222 0

c  1+1 --> 2
c    (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0 ∧  p_32) -> (-b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0)
c  in CNF:
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_2
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨  b^{8, 5}_1
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ -p_32 ∨ -b^{8, 5}_0
c  in DIMACS:
 10217  10218 -10219 -32 -10220 0
 10217  10218 -10219 -32  10221 0
 10217  10218 -10219 -32 -10222 0

c  2+1 --> break 
c    (-b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧  p_32) -> break
c  in CNF:
c     b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 10217 -10218  10219 -32 1162 0


c  2-1 --> 1
c    (-b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧ -p_32) -> (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0)
c  in CNF:
c     b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_2
c     b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_1
c     b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨  b^{8, 5}_0
c  in DIMACS:
 10217 -10218  10219  32 -10220 0
 10217 -10218  10219  32 -10221 0
 10217 -10218  10219  32  10222 0

c  1-1 --> 0
c    (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0 ∧ -p_32) -> (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧ -b^{8, 5}_0)
c  in CNF:
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_2
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_1
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_0
c  in DIMACS:
 10217  10218 -10219  32 -10220 0
 10217  10218 -10219  32 -10221 0
 10217  10218 -10219  32 -10222 0

c  0-1 --> -1
c    (-b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧ -p_32) -> ( b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0)
c  in CNF:
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨  b^{8, 5}_2
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_1
c     b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨  b^{8, 5}_0
c  in DIMACS:
 10217  10218  10219  32  10220 0
 10217  10218  10219  32 -10221 0
 10217  10218  10219  32  10222 0

c  -1-1 --> -2
c    ( b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧  b^{8, 4}_0 ∧ -p_32) -> ( b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0)
c  in CNF:
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨  b^{8, 5}_2
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨  b^{8, 5}_1
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨  p_32 ∨ -b^{8, 5}_0
c  in DIMACS:
-10217  10218 -10219  32  10220 0
-10217  10218 -10219  32  10221 0
-10217  10218 -10219  32 -10222 0

c  -2-1 --> break 
c    ( b^{8, 4}_2 ∧  b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨  b^{8, 4}_0 ∨  p_32 ∨ break
c  in DIMACS:
-10217 -10218  10219  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 4}_2 ∧ -b^{8, 4}_1 ∧ -b^{8, 4}_0 ∧ true) 
c  in CNF:
c    -b^{8, 4}_2 ∨  b^{8, 4}_1 ∨  b^{8, 4}_0 ∨ false 
c  in DIMACS:
-10217  10218  10219  0

c  3 does not represent an automaton state.
c    -(-b^{8, 4}_2 ∧  b^{8, 4}_1 ∧  b^{8, 4}_0 ∧ true) 
c  in CNF:
c     b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ false 
c  in DIMACS:
 10217 -10218 -10219  0
c  -3 does not represent an automaton state.
c    -( b^{8, 4}_2 ∧  b^{8, 4}_1 ∧  b^{8, 4}_0 ∧ true) 
c  in CNF:
c    -b^{8, 4}_2 ∨ -b^{8, 4}_1 ∨ -b^{8, 4}_0 ∨ false 
c  in DIMACS:
-10217 -10218 -10219  0

c i = 5
c  -2+1 --> -1
c    ( b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧  p_40) -> ( b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0)
c  in CNF:
c    -b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨  b^{8, 6}_2
c    -b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_1
c    -b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨  b^{8, 6}_0
c  in DIMACS:
-10220 -10221  10222 -40  10223 0
-10220 -10221  10222 -40 -10224 0
-10220 -10221  10222 -40  10225 0

c  -1+1 --> 0
c    ( b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0 ∧  p_40) -> (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧ -b^{8, 6}_0)
c  in CNF:
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_2
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_1
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_0
c  in DIMACS:
-10220  10221 -10222 -40 -10223 0
-10220  10221 -10222 -40 -10224 0
-10220  10221 -10222 -40 -10225 0

c  0+1 --> 1
c    (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧  p_40) -> (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0)
c  in CNF:
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_2
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_1
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨  b^{8, 6}_0
c  in DIMACS:
 10220  10221  10222 -40 -10223 0
 10220  10221  10222 -40 -10224 0
 10220  10221  10222 -40  10225 0

c  1+1 --> 2
c    (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0 ∧  p_40) -> (-b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0)
c  in CNF:
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_2
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨  b^{8, 6}_1
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ -p_40 ∨ -b^{8, 6}_0
c  in DIMACS:
 10220  10221 -10222 -40 -10223 0
 10220  10221 -10222 -40  10224 0
 10220  10221 -10222 -40 -10225 0

c  2+1 --> break 
c    (-b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧  p_40) -> break
c  in CNF:
c     b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 10220 -10221  10222 -40 1162 0


c  2-1 --> 1
c    (-b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧ -p_40) -> (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0)
c  in CNF:
c     b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_2
c     b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_1
c     b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨  b^{8, 6}_0
c  in DIMACS:
 10220 -10221  10222  40 -10223 0
 10220 -10221  10222  40 -10224 0
 10220 -10221  10222  40  10225 0

c  1-1 --> 0
c    (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0 ∧ -p_40) -> (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧ -b^{8, 6}_0)
c  in CNF:
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_2
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_1
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_0
c  in DIMACS:
 10220  10221 -10222  40 -10223 0
 10220  10221 -10222  40 -10224 0
 10220  10221 -10222  40 -10225 0

c  0-1 --> -1
c    (-b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧ -p_40) -> ( b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0)
c  in CNF:
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨  b^{8, 6}_2
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_1
c     b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨  b^{8, 6}_0
c  in DIMACS:
 10220  10221  10222  40  10223 0
 10220  10221  10222  40 -10224 0
 10220  10221  10222  40  10225 0

c  -1-1 --> -2
c    ( b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧  b^{8, 5}_0 ∧ -p_40) -> ( b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0)
c  in CNF:
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨  b^{8, 6}_2
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨  b^{8, 6}_1
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨  p_40 ∨ -b^{8, 6}_0
c  in DIMACS:
-10220  10221 -10222  40  10223 0
-10220  10221 -10222  40  10224 0
-10220  10221 -10222  40 -10225 0

c  -2-1 --> break 
c    ( b^{8, 5}_2 ∧  b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨  b^{8, 5}_0 ∨  p_40 ∨ break
c  in DIMACS:
-10220 -10221  10222  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 5}_2 ∧ -b^{8, 5}_1 ∧ -b^{8, 5}_0 ∧ true) 
c  in CNF:
c    -b^{8, 5}_2 ∨  b^{8, 5}_1 ∨  b^{8, 5}_0 ∨ false 
c  in DIMACS:
-10220  10221  10222  0

c  3 does not represent an automaton state.
c    -(-b^{8, 5}_2 ∧  b^{8, 5}_1 ∧  b^{8, 5}_0 ∧ true) 
c  in CNF:
c     b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ false 
c  in DIMACS:
 10220 -10221 -10222  0
c  -3 does not represent an automaton state.
c    -( b^{8, 5}_2 ∧  b^{8, 5}_1 ∧  b^{8, 5}_0 ∧ true) 
c  in CNF:
c    -b^{8, 5}_2 ∨ -b^{8, 5}_1 ∨ -b^{8, 5}_0 ∨ false 
c  in DIMACS:
-10220 -10221 -10222  0

c i = 6
c  -2+1 --> -1
c    ( b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧  p_48) -> ( b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0)
c  in CNF:
c    -b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨  b^{8, 7}_2
c    -b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_1
c    -b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨  b^{8, 7}_0
c  in DIMACS:
-10223 -10224  10225 -48  10226 0
-10223 -10224  10225 -48 -10227 0
-10223 -10224  10225 -48  10228 0

c  -1+1 --> 0
c    ( b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0 ∧  p_48) -> (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧ -b^{8, 7}_0)
c  in CNF:
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_2
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_1
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_0
c  in DIMACS:
-10223  10224 -10225 -48 -10226 0
-10223  10224 -10225 -48 -10227 0
-10223  10224 -10225 -48 -10228 0

c  0+1 --> 1
c    (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧  p_48) -> (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0)
c  in CNF:
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_2
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_1
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨  b^{8, 7}_0
c  in DIMACS:
 10223  10224  10225 -48 -10226 0
 10223  10224  10225 -48 -10227 0
 10223  10224  10225 -48  10228 0

c  1+1 --> 2
c    (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0 ∧  p_48) -> (-b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0)
c  in CNF:
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_2
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨  b^{8, 7}_1
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ -p_48 ∨ -b^{8, 7}_0
c  in DIMACS:
 10223  10224 -10225 -48 -10226 0
 10223  10224 -10225 -48  10227 0
 10223  10224 -10225 -48 -10228 0

c  2+1 --> break 
c    (-b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧  p_48) -> break
c  in CNF:
c     b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 10223 -10224  10225 -48 1162 0


c  2-1 --> 1
c    (-b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧ -p_48) -> (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0)
c  in CNF:
c     b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_2
c     b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_1
c     b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨  b^{8, 7}_0
c  in DIMACS:
 10223 -10224  10225  48 -10226 0
 10223 -10224  10225  48 -10227 0
 10223 -10224  10225  48  10228 0

c  1-1 --> 0
c    (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0 ∧ -p_48) -> (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧ -b^{8, 7}_0)
c  in CNF:
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_2
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_1
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_0
c  in DIMACS:
 10223  10224 -10225  48 -10226 0
 10223  10224 -10225  48 -10227 0
 10223  10224 -10225  48 -10228 0

c  0-1 --> -1
c    (-b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧ -p_48) -> ( b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0)
c  in CNF:
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨  b^{8, 7}_2
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_1
c     b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨  b^{8, 7}_0
c  in DIMACS:
 10223  10224  10225  48  10226 0
 10223  10224  10225  48 -10227 0
 10223  10224  10225  48  10228 0

c  -1-1 --> -2
c    ( b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧  b^{8, 6}_0 ∧ -p_48) -> ( b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0)
c  in CNF:
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨  b^{8, 7}_2
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨  b^{8, 7}_1
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨  p_48 ∨ -b^{8, 7}_0
c  in DIMACS:
-10223  10224 -10225  48  10226 0
-10223  10224 -10225  48  10227 0
-10223  10224 -10225  48 -10228 0

c  -2-1 --> break 
c    ( b^{8, 6}_2 ∧  b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨  b^{8, 6}_0 ∨  p_48 ∨ break
c  in DIMACS:
-10223 -10224  10225  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 6}_2 ∧ -b^{8, 6}_1 ∧ -b^{8, 6}_0 ∧ true) 
c  in CNF:
c    -b^{8, 6}_2 ∨  b^{8, 6}_1 ∨  b^{8, 6}_0 ∨ false 
c  in DIMACS:
-10223  10224  10225  0

c  3 does not represent an automaton state.
c    -(-b^{8, 6}_2 ∧  b^{8, 6}_1 ∧  b^{8, 6}_0 ∧ true) 
c  in CNF:
c     b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ false 
c  in DIMACS:
 10223 -10224 -10225  0
c  -3 does not represent an automaton state.
c    -( b^{8, 6}_2 ∧  b^{8, 6}_1 ∧  b^{8, 6}_0 ∧ true) 
c  in CNF:
c    -b^{8, 6}_2 ∨ -b^{8, 6}_1 ∨ -b^{8, 6}_0 ∨ false 
c  in DIMACS:
-10223 -10224 -10225  0

c i = 7
c  -2+1 --> -1
c    ( b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧  p_56) -> ( b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0)
c  in CNF:
c    -b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨  b^{8, 8}_2
c    -b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_1
c    -b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨  b^{8, 8}_0
c  in DIMACS:
-10226 -10227  10228 -56  10229 0
-10226 -10227  10228 -56 -10230 0
-10226 -10227  10228 -56  10231 0

c  -1+1 --> 0
c    ( b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0 ∧  p_56) -> (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧ -b^{8, 8}_0)
c  in CNF:
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_2
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_1
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_0
c  in DIMACS:
-10226  10227 -10228 -56 -10229 0
-10226  10227 -10228 -56 -10230 0
-10226  10227 -10228 -56 -10231 0

c  0+1 --> 1
c    (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧  p_56) -> (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0)
c  in CNF:
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_2
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_1
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨  b^{8, 8}_0
c  in DIMACS:
 10226  10227  10228 -56 -10229 0
 10226  10227  10228 -56 -10230 0
 10226  10227  10228 -56  10231 0

c  1+1 --> 2
c    (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0 ∧  p_56) -> (-b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0)
c  in CNF:
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_2
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨  b^{8, 8}_1
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ -p_56 ∨ -b^{8, 8}_0
c  in DIMACS:
 10226  10227 -10228 -56 -10229 0
 10226  10227 -10228 -56  10230 0
 10226  10227 -10228 -56 -10231 0

c  2+1 --> break 
c    (-b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧  p_56) -> break
c  in CNF:
c     b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 10226 -10227  10228 -56 1162 0


c  2-1 --> 1
c    (-b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧ -p_56) -> (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0)
c  in CNF:
c     b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_2
c     b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_1
c     b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨  b^{8, 8}_0
c  in DIMACS:
 10226 -10227  10228  56 -10229 0
 10226 -10227  10228  56 -10230 0
 10226 -10227  10228  56  10231 0

c  1-1 --> 0
c    (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0 ∧ -p_56) -> (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧ -b^{8, 8}_0)
c  in CNF:
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_2
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_1
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_0
c  in DIMACS:
 10226  10227 -10228  56 -10229 0
 10226  10227 -10228  56 -10230 0
 10226  10227 -10228  56 -10231 0

c  0-1 --> -1
c    (-b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧ -p_56) -> ( b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0)
c  in CNF:
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨  b^{8, 8}_2
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_1
c     b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨  b^{8, 8}_0
c  in DIMACS:
 10226  10227  10228  56  10229 0
 10226  10227  10228  56 -10230 0
 10226  10227  10228  56  10231 0

c  -1-1 --> -2
c    ( b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧  b^{8, 7}_0 ∧ -p_56) -> ( b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0)
c  in CNF:
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨  b^{8, 8}_2
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨  b^{8, 8}_1
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨  p_56 ∨ -b^{8, 8}_0
c  in DIMACS:
-10226  10227 -10228  56  10229 0
-10226  10227 -10228  56  10230 0
-10226  10227 -10228  56 -10231 0

c  -2-1 --> break 
c    ( b^{8, 7}_2 ∧  b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨  b^{8, 7}_0 ∨  p_56 ∨ break
c  in DIMACS:
-10226 -10227  10228  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 7}_2 ∧ -b^{8, 7}_1 ∧ -b^{8, 7}_0 ∧ true) 
c  in CNF:
c    -b^{8, 7}_2 ∨  b^{8, 7}_1 ∨  b^{8, 7}_0 ∨ false 
c  in DIMACS:
-10226  10227  10228  0

c  3 does not represent an automaton state.
c    -(-b^{8, 7}_2 ∧  b^{8, 7}_1 ∧  b^{8, 7}_0 ∧ true) 
c  in CNF:
c     b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ false 
c  in DIMACS:
 10226 -10227 -10228  0
c  -3 does not represent an automaton state.
c    -( b^{8, 7}_2 ∧  b^{8, 7}_1 ∧  b^{8, 7}_0 ∧ true) 
c  in CNF:
c    -b^{8, 7}_2 ∨ -b^{8, 7}_1 ∨ -b^{8, 7}_0 ∨ false 
c  in DIMACS:
-10226 -10227 -10228  0

c i = 8
c  -2+1 --> -1
c    ( b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧  p_64) -> ( b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0)
c  in CNF:
c    -b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨  b^{8, 9}_2
c    -b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_1
c    -b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨  b^{8, 9}_0
c  in DIMACS:
-10229 -10230  10231 -64  10232 0
-10229 -10230  10231 -64 -10233 0
-10229 -10230  10231 -64  10234 0

c  -1+1 --> 0
c    ( b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0 ∧  p_64) -> (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧ -b^{8, 9}_0)
c  in CNF:
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_2
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_1
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_0
c  in DIMACS:
-10229  10230 -10231 -64 -10232 0
-10229  10230 -10231 -64 -10233 0
-10229  10230 -10231 -64 -10234 0

c  0+1 --> 1
c    (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧  p_64) -> (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0)
c  in CNF:
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_2
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_1
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨  b^{8, 9}_0
c  in DIMACS:
 10229  10230  10231 -64 -10232 0
 10229  10230  10231 -64 -10233 0
 10229  10230  10231 -64  10234 0

c  1+1 --> 2
c    (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0 ∧  p_64) -> (-b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0)
c  in CNF:
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_2
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨  b^{8, 9}_1
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ -p_64 ∨ -b^{8, 9}_0
c  in DIMACS:
 10229  10230 -10231 -64 -10232 0
 10229  10230 -10231 -64  10233 0
 10229  10230 -10231 -64 -10234 0

c  2+1 --> break 
c    (-b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧  p_64) -> break
c  in CNF:
c     b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 10229 -10230  10231 -64 1162 0


c  2-1 --> 1
c    (-b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧ -p_64) -> (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0)
c  in CNF:
c     b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_2
c     b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_1
c     b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨  b^{8, 9}_0
c  in DIMACS:
 10229 -10230  10231  64 -10232 0
 10229 -10230  10231  64 -10233 0
 10229 -10230  10231  64  10234 0

c  1-1 --> 0
c    (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0 ∧ -p_64) -> (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧ -b^{8, 9}_0)
c  in CNF:
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_2
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_1
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_0
c  in DIMACS:
 10229  10230 -10231  64 -10232 0
 10229  10230 -10231  64 -10233 0
 10229  10230 -10231  64 -10234 0

c  0-1 --> -1
c    (-b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧ -p_64) -> ( b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0)
c  in CNF:
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨  b^{8, 9}_2
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_1
c     b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨  b^{8, 9}_0
c  in DIMACS:
 10229  10230  10231  64  10232 0
 10229  10230  10231  64 -10233 0
 10229  10230  10231  64  10234 0

c  -1-1 --> -2
c    ( b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧  b^{8, 8}_0 ∧ -p_64) -> ( b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0)
c  in CNF:
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨  b^{8, 9}_2
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨  b^{8, 9}_1
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨  p_64 ∨ -b^{8, 9}_0
c  in DIMACS:
-10229  10230 -10231  64  10232 0
-10229  10230 -10231  64  10233 0
-10229  10230 -10231  64 -10234 0

c  -2-1 --> break 
c    ( b^{8, 8}_2 ∧  b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨  b^{8, 8}_0 ∨  p_64 ∨ break
c  in DIMACS:
-10229 -10230  10231  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 8}_2 ∧ -b^{8, 8}_1 ∧ -b^{8, 8}_0 ∧ true) 
c  in CNF:
c    -b^{8, 8}_2 ∨  b^{8, 8}_1 ∨  b^{8, 8}_0 ∨ false 
c  in DIMACS:
-10229  10230  10231  0

c  3 does not represent an automaton state.
c    -(-b^{8, 8}_2 ∧  b^{8, 8}_1 ∧  b^{8, 8}_0 ∧ true) 
c  in CNF:
c     b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ false 
c  in DIMACS:
 10229 -10230 -10231  0
c  -3 does not represent an automaton state.
c    -( b^{8, 8}_2 ∧  b^{8, 8}_1 ∧  b^{8, 8}_0 ∧ true) 
c  in CNF:
c    -b^{8, 8}_2 ∨ -b^{8, 8}_1 ∨ -b^{8, 8}_0 ∨ false 
c  in DIMACS:
-10229 -10230 -10231  0

c i = 9
c  -2+1 --> -1
c    ( b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧  p_72) -> ( b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0)
c  in CNF:
c    -b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨  b^{8, 10}_2
c    -b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_1
c    -b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨  b^{8, 10}_0
c  in DIMACS:
-10232 -10233  10234 -72  10235 0
-10232 -10233  10234 -72 -10236 0
-10232 -10233  10234 -72  10237 0

c  -1+1 --> 0
c    ( b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0 ∧  p_72) -> (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧ -b^{8, 10}_0)
c  in CNF:
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_2
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_1
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_0
c  in DIMACS:
-10232  10233 -10234 -72 -10235 0
-10232  10233 -10234 -72 -10236 0
-10232  10233 -10234 -72 -10237 0

c  0+1 --> 1
c    (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧  p_72) -> (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0)
c  in CNF:
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_2
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_1
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨  b^{8, 10}_0
c  in DIMACS:
 10232  10233  10234 -72 -10235 0
 10232  10233  10234 -72 -10236 0
 10232  10233  10234 -72  10237 0

c  1+1 --> 2
c    (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0 ∧  p_72) -> (-b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0)
c  in CNF:
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_2
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨  b^{8, 10}_1
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ -p_72 ∨ -b^{8, 10}_0
c  in DIMACS:
 10232  10233 -10234 -72 -10235 0
 10232  10233 -10234 -72  10236 0
 10232  10233 -10234 -72 -10237 0

c  2+1 --> break 
c    (-b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧  p_72) -> break
c  in CNF:
c     b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 10232 -10233  10234 -72 1162 0


c  2-1 --> 1
c    (-b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧ -p_72) -> (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0)
c  in CNF:
c     b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_2
c     b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_1
c     b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨  b^{8, 10}_0
c  in DIMACS:
 10232 -10233  10234  72 -10235 0
 10232 -10233  10234  72 -10236 0
 10232 -10233  10234  72  10237 0

c  1-1 --> 0
c    (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0 ∧ -p_72) -> (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧ -b^{8, 10}_0)
c  in CNF:
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_2
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_1
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_0
c  in DIMACS:
 10232  10233 -10234  72 -10235 0
 10232  10233 -10234  72 -10236 0
 10232  10233 -10234  72 -10237 0

c  0-1 --> -1
c    (-b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧ -p_72) -> ( b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0)
c  in CNF:
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨  b^{8, 10}_2
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_1
c     b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨  b^{8, 10}_0
c  in DIMACS:
 10232  10233  10234  72  10235 0
 10232  10233  10234  72 -10236 0
 10232  10233  10234  72  10237 0

c  -1-1 --> -2
c    ( b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧  b^{8, 9}_0 ∧ -p_72) -> ( b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0)
c  in CNF:
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨  b^{8, 10}_2
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨  b^{8, 10}_1
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨  p_72 ∨ -b^{8, 10}_0
c  in DIMACS:
-10232  10233 -10234  72  10235 0
-10232  10233 -10234  72  10236 0
-10232  10233 -10234  72 -10237 0

c  -2-1 --> break 
c    ( b^{8, 9}_2 ∧  b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨  b^{8, 9}_0 ∨  p_72 ∨ break
c  in DIMACS:
-10232 -10233  10234  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 9}_2 ∧ -b^{8, 9}_1 ∧ -b^{8, 9}_0 ∧ true) 
c  in CNF:
c    -b^{8, 9}_2 ∨  b^{8, 9}_1 ∨  b^{8, 9}_0 ∨ false 
c  in DIMACS:
-10232  10233  10234  0

c  3 does not represent an automaton state.
c    -(-b^{8, 9}_2 ∧  b^{8, 9}_1 ∧  b^{8, 9}_0 ∧ true) 
c  in CNF:
c     b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ false 
c  in DIMACS:
 10232 -10233 -10234  0
c  -3 does not represent an automaton state.
c    -( b^{8, 9}_2 ∧  b^{8, 9}_1 ∧  b^{8, 9}_0 ∧ true) 
c  in CNF:
c    -b^{8, 9}_2 ∨ -b^{8, 9}_1 ∨ -b^{8, 9}_0 ∨ false 
c  in DIMACS:
-10232 -10233 -10234  0

c i = 10
c  -2+1 --> -1
c    ( b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧  p_80) -> ( b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0)
c  in CNF:
c    -b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨  b^{8, 11}_2
c    -b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_1
c    -b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨  b^{8, 11}_0
c  in DIMACS:
-10235 -10236  10237 -80  10238 0
-10235 -10236  10237 -80 -10239 0
-10235 -10236  10237 -80  10240 0

c  -1+1 --> 0
c    ( b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0 ∧  p_80) -> (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧ -b^{8, 11}_0)
c  in CNF:
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_2
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_1
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_0
c  in DIMACS:
-10235  10236 -10237 -80 -10238 0
-10235  10236 -10237 -80 -10239 0
-10235  10236 -10237 -80 -10240 0

c  0+1 --> 1
c    (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧  p_80) -> (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0)
c  in CNF:
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_2
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_1
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨  b^{8, 11}_0
c  in DIMACS:
 10235  10236  10237 -80 -10238 0
 10235  10236  10237 -80 -10239 0
 10235  10236  10237 -80  10240 0

c  1+1 --> 2
c    (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0 ∧  p_80) -> (-b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0)
c  in CNF:
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_2
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨  b^{8, 11}_1
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ -p_80 ∨ -b^{8, 11}_0
c  in DIMACS:
 10235  10236 -10237 -80 -10238 0
 10235  10236 -10237 -80  10239 0
 10235  10236 -10237 -80 -10240 0

c  2+1 --> break 
c    (-b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧  p_80) -> break
c  in CNF:
c     b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 10235 -10236  10237 -80 1162 0


c  2-1 --> 1
c    (-b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧ -p_80) -> (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0)
c  in CNF:
c     b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_2
c     b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_1
c     b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨  b^{8, 11}_0
c  in DIMACS:
 10235 -10236  10237  80 -10238 0
 10235 -10236  10237  80 -10239 0
 10235 -10236  10237  80  10240 0

c  1-1 --> 0
c    (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0 ∧ -p_80) -> (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧ -b^{8, 11}_0)
c  in CNF:
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_2
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_1
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_0
c  in DIMACS:
 10235  10236 -10237  80 -10238 0
 10235  10236 -10237  80 -10239 0
 10235  10236 -10237  80 -10240 0

c  0-1 --> -1
c    (-b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧ -p_80) -> ( b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0)
c  in CNF:
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨  b^{8, 11}_2
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_1
c     b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨  b^{8, 11}_0
c  in DIMACS:
 10235  10236  10237  80  10238 0
 10235  10236  10237  80 -10239 0
 10235  10236  10237  80  10240 0

c  -1-1 --> -2
c    ( b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧  b^{8, 10}_0 ∧ -p_80) -> ( b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0)
c  in CNF:
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨  b^{8, 11}_2
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨  b^{8, 11}_1
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨  p_80 ∨ -b^{8, 11}_0
c  in DIMACS:
-10235  10236 -10237  80  10238 0
-10235  10236 -10237  80  10239 0
-10235  10236 -10237  80 -10240 0

c  -2-1 --> break 
c    ( b^{8, 10}_2 ∧  b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨  b^{8, 10}_0 ∨  p_80 ∨ break
c  in DIMACS:
-10235 -10236  10237  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 10}_2 ∧ -b^{8, 10}_1 ∧ -b^{8, 10}_0 ∧ true) 
c  in CNF:
c    -b^{8, 10}_2 ∨  b^{8, 10}_1 ∨  b^{8, 10}_0 ∨ false 
c  in DIMACS:
-10235  10236  10237  0

c  3 does not represent an automaton state.
c    -(-b^{8, 10}_2 ∧  b^{8, 10}_1 ∧  b^{8, 10}_0 ∧ true) 
c  in CNF:
c     b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ false 
c  in DIMACS:
 10235 -10236 -10237  0
c  -3 does not represent an automaton state.
c    -( b^{8, 10}_2 ∧  b^{8, 10}_1 ∧  b^{8, 10}_0 ∧ true) 
c  in CNF:
c    -b^{8, 10}_2 ∨ -b^{8, 10}_1 ∨ -b^{8, 10}_0 ∨ false 
c  in DIMACS:
-10235 -10236 -10237  0

c i = 11
c  -2+1 --> -1
c    ( b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧  p_88) -> ( b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0)
c  in CNF:
c    -b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨  b^{8, 12}_2
c    -b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_1
c    -b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨  b^{8, 12}_0
c  in DIMACS:
-10238 -10239  10240 -88  10241 0
-10238 -10239  10240 -88 -10242 0
-10238 -10239  10240 -88  10243 0

c  -1+1 --> 0
c    ( b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0 ∧  p_88) -> (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧ -b^{8, 12}_0)
c  in CNF:
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_2
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_1
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_0
c  in DIMACS:
-10238  10239 -10240 -88 -10241 0
-10238  10239 -10240 -88 -10242 0
-10238  10239 -10240 -88 -10243 0

c  0+1 --> 1
c    (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧  p_88) -> (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0)
c  in CNF:
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_2
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_1
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨  b^{8, 12}_0
c  in DIMACS:
 10238  10239  10240 -88 -10241 0
 10238  10239  10240 -88 -10242 0
 10238  10239  10240 -88  10243 0

c  1+1 --> 2
c    (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0 ∧  p_88) -> (-b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0)
c  in CNF:
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_2
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨  b^{8, 12}_1
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ -p_88 ∨ -b^{8, 12}_0
c  in DIMACS:
 10238  10239 -10240 -88 -10241 0
 10238  10239 -10240 -88  10242 0
 10238  10239 -10240 -88 -10243 0

c  2+1 --> break 
c    (-b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧  p_88) -> break
c  in CNF:
c     b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 10238 -10239  10240 -88 1162 0


c  2-1 --> 1
c    (-b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧ -p_88) -> (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0)
c  in CNF:
c     b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_2
c     b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_1
c     b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨  b^{8, 12}_0
c  in DIMACS:
 10238 -10239  10240  88 -10241 0
 10238 -10239  10240  88 -10242 0
 10238 -10239  10240  88  10243 0

c  1-1 --> 0
c    (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0 ∧ -p_88) -> (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧ -b^{8, 12}_0)
c  in CNF:
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_2
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_1
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_0
c  in DIMACS:
 10238  10239 -10240  88 -10241 0
 10238  10239 -10240  88 -10242 0
 10238  10239 -10240  88 -10243 0

c  0-1 --> -1
c    (-b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧ -p_88) -> ( b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0)
c  in CNF:
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨  b^{8, 12}_2
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_1
c     b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨  b^{8, 12}_0
c  in DIMACS:
 10238  10239  10240  88  10241 0
 10238  10239  10240  88 -10242 0
 10238  10239  10240  88  10243 0

c  -1-1 --> -2
c    ( b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧  b^{8, 11}_0 ∧ -p_88) -> ( b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0)
c  in CNF:
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨  b^{8, 12}_2
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨  b^{8, 12}_1
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨  p_88 ∨ -b^{8, 12}_0
c  in DIMACS:
-10238  10239 -10240  88  10241 0
-10238  10239 -10240  88  10242 0
-10238  10239 -10240  88 -10243 0

c  -2-1 --> break 
c    ( b^{8, 11}_2 ∧  b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨  b^{8, 11}_0 ∨  p_88 ∨ break
c  in DIMACS:
-10238 -10239  10240  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 11}_2 ∧ -b^{8, 11}_1 ∧ -b^{8, 11}_0 ∧ true) 
c  in CNF:
c    -b^{8, 11}_2 ∨  b^{8, 11}_1 ∨  b^{8, 11}_0 ∨ false 
c  in DIMACS:
-10238  10239  10240  0

c  3 does not represent an automaton state.
c    -(-b^{8, 11}_2 ∧  b^{8, 11}_1 ∧  b^{8, 11}_0 ∧ true) 
c  in CNF:
c     b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ false 
c  in DIMACS:
 10238 -10239 -10240  0
c  -3 does not represent an automaton state.
c    -( b^{8, 11}_2 ∧  b^{8, 11}_1 ∧  b^{8, 11}_0 ∧ true) 
c  in CNF:
c    -b^{8, 11}_2 ∨ -b^{8, 11}_1 ∨ -b^{8, 11}_0 ∨ false 
c  in DIMACS:
-10238 -10239 -10240  0

c i = 12
c  -2+1 --> -1
c    ( b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧  p_96) -> ( b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0)
c  in CNF:
c    -b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨  b^{8, 13}_2
c    -b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_1
c    -b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨  b^{8, 13}_0
c  in DIMACS:
-10241 -10242  10243 -96  10244 0
-10241 -10242  10243 -96 -10245 0
-10241 -10242  10243 -96  10246 0

c  -1+1 --> 0
c    ( b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0 ∧  p_96) -> (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧ -b^{8, 13}_0)
c  in CNF:
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_2
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_1
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_0
c  in DIMACS:
-10241  10242 -10243 -96 -10244 0
-10241  10242 -10243 -96 -10245 0
-10241  10242 -10243 -96 -10246 0

c  0+1 --> 1
c    (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧  p_96) -> (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0)
c  in CNF:
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_2
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_1
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨  b^{8, 13}_0
c  in DIMACS:
 10241  10242  10243 -96 -10244 0
 10241  10242  10243 -96 -10245 0
 10241  10242  10243 -96  10246 0

c  1+1 --> 2
c    (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0 ∧  p_96) -> (-b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0)
c  in CNF:
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_2
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨  b^{8, 13}_1
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ -p_96 ∨ -b^{8, 13}_0
c  in DIMACS:
 10241  10242 -10243 -96 -10244 0
 10241  10242 -10243 -96  10245 0
 10241  10242 -10243 -96 -10246 0

c  2+1 --> break 
c    (-b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧  p_96) -> break
c  in CNF:
c     b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 10241 -10242  10243 -96 1162 0


c  2-1 --> 1
c    (-b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧ -p_96) -> (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0)
c  in CNF:
c     b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_2
c     b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_1
c     b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨  b^{8, 13}_0
c  in DIMACS:
 10241 -10242  10243  96 -10244 0
 10241 -10242  10243  96 -10245 0
 10241 -10242  10243  96  10246 0

c  1-1 --> 0
c    (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0 ∧ -p_96) -> (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧ -b^{8, 13}_0)
c  in CNF:
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_2
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_1
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_0
c  in DIMACS:
 10241  10242 -10243  96 -10244 0
 10241  10242 -10243  96 -10245 0
 10241  10242 -10243  96 -10246 0

c  0-1 --> -1
c    (-b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧ -p_96) -> ( b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0)
c  in CNF:
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨  b^{8, 13}_2
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_1
c     b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨  b^{8, 13}_0
c  in DIMACS:
 10241  10242  10243  96  10244 0
 10241  10242  10243  96 -10245 0
 10241  10242  10243  96  10246 0

c  -1-1 --> -2
c    ( b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧  b^{8, 12}_0 ∧ -p_96) -> ( b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0)
c  in CNF:
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨  b^{8, 13}_2
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨  b^{8, 13}_1
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨  p_96 ∨ -b^{8, 13}_0
c  in DIMACS:
-10241  10242 -10243  96  10244 0
-10241  10242 -10243  96  10245 0
-10241  10242 -10243  96 -10246 0

c  -2-1 --> break 
c    ( b^{8, 12}_2 ∧  b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨  b^{8, 12}_0 ∨  p_96 ∨ break
c  in DIMACS:
-10241 -10242  10243  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 12}_2 ∧ -b^{8, 12}_1 ∧ -b^{8, 12}_0 ∧ true) 
c  in CNF:
c    -b^{8, 12}_2 ∨  b^{8, 12}_1 ∨  b^{8, 12}_0 ∨ false 
c  in DIMACS:
-10241  10242  10243  0

c  3 does not represent an automaton state.
c    -(-b^{8, 12}_2 ∧  b^{8, 12}_1 ∧  b^{8, 12}_0 ∧ true) 
c  in CNF:
c     b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ false 
c  in DIMACS:
 10241 -10242 -10243  0
c  -3 does not represent an automaton state.
c    -( b^{8, 12}_2 ∧  b^{8, 12}_1 ∧  b^{8, 12}_0 ∧ true) 
c  in CNF:
c    -b^{8, 12}_2 ∨ -b^{8, 12}_1 ∨ -b^{8, 12}_0 ∨ false 
c  in DIMACS:
-10241 -10242 -10243  0

c i = 13
c  -2+1 --> -1
c    ( b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧  p_104) -> ( b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0)
c  in CNF:
c    -b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨  b^{8, 14}_2
c    -b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_1
c    -b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨  b^{8, 14}_0
c  in DIMACS:
-10244 -10245  10246 -104  10247 0
-10244 -10245  10246 -104 -10248 0
-10244 -10245  10246 -104  10249 0

c  -1+1 --> 0
c    ( b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0 ∧  p_104) -> (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧ -b^{8, 14}_0)
c  in CNF:
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_2
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_1
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_0
c  in DIMACS:
-10244  10245 -10246 -104 -10247 0
-10244  10245 -10246 -104 -10248 0
-10244  10245 -10246 -104 -10249 0

c  0+1 --> 1
c    (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧  p_104) -> (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0)
c  in CNF:
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_2
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_1
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨  b^{8, 14}_0
c  in DIMACS:
 10244  10245  10246 -104 -10247 0
 10244  10245  10246 -104 -10248 0
 10244  10245  10246 -104  10249 0

c  1+1 --> 2
c    (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0 ∧  p_104) -> (-b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0)
c  in CNF:
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_2
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨  b^{8, 14}_1
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ -p_104 ∨ -b^{8, 14}_0
c  in DIMACS:
 10244  10245 -10246 -104 -10247 0
 10244  10245 -10246 -104  10248 0
 10244  10245 -10246 -104 -10249 0

c  2+1 --> break 
c    (-b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧  p_104) -> break
c  in CNF:
c     b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 10244 -10245  10246 -104 1162 0


c  2-1 --> 1
c    (-b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧ -p_104) -> (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0)
c  in CNF:
c     b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_2
c     b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_1
c     b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨  b^{8, 14}_0
c  in DIMACS:
 10244 -10245  10246  104 -10247 0
 10244 -10245  10246  104 -10248 0
 10244 -10245  10246  104  10249 0

c  1-1 --> 0
c    (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0 ∧ -p_104) -> (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧ -b^{8, 14}_0)
c  in CNF:
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_2
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_1
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_0
c  in DIMACS:
 10244  10245 -10246  104 -10247 0
 10244  10245 -10246  104 -10248 0
 10244  10245 -10246  104 -10249 0

c  0-1 --> -1
c    (-b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧ -p_104) -> ( b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0)
c  in CNF:
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨  b^{8, 14}_2
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_1
c     b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨  b^{8, 14}_0
c  in DIMACS:
 10244  10245  10246  104  10247 0
 10244  10245  10246  104 -10248 0
 10244  10245  10246  104  10249 0

c  -1-1 --> -2
c    ( b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧  b^{8, 13}_0 ∧ -p_104) -> ( b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0)
c  in CNF:
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨  b^{8, 14}_2
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨  b^{8, 14}_1
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨  p_104 ∨ -b^{8, 14}_0
c  in DIMACS:
-10244  10245 -10246  104  10247 0
-10244  10245 -10246  104  10248 0
-10244  10245 -10246  104 -10249 0

c  -2-1 --> break 
c    ( b^{8, 13}_2 ∧  b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨  b^{8, 13}_0 ∨  p_104 ∨ break
c  in DIMACS:
-10244 -10245  10246  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 13}_2 ∧ -b^{8, 13}_1 ∧ -b^{8, 13}_0 ∧ true) 
c  in CNF:
c    -b^{8, 13}_2 ∨  b^{8, 13}_1 ∨  b^{8, 13}_0 ∨ false 
c  in DIMACS:
-10244  10245  10246  0

c  3 does not represent an automaton state.
c    -(-b^{8, 13}_2 ∧  b^{8, 13}_1 ∧  b^{8, 13}_0 ∧ true) 
c  in CNF:
c     b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ false 
c  in DIMACS:
 10244 -10245 -10246  0
c  -3 does not represent an automaton state.
c    -( b^{8, 13}_2 ∧  b^{8, 13}_1 ∧  b^{8, 13}_0 ∧ true) 
c  in CNF:
c    -b^{8, 13}_2 ∨ -b^{8, 13}_1 ∨ -b^{8, 13}_0 ∨ false 
c  in DIMACS:
-10244 -10245 -10246  0

c i = 14
c  -2+1 --> -1
c    ( b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧  p_112) -> ( b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0)
c  in CNF:
c    -b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨  b^{8, 15}_2
c    -b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_1
c    -b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨  b^{8, 15}_0
c  in DIMACS:
-10247 -10248  10249 -112  10250 0
-10247 -10248  10249 -112 -10251 0
-10247 -10248  10249 -112  10252 0

c  -1+1 --> 0
c    ( b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0 ∧  p_112) -> (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧ -b^{8, 15}_0)
c  in CNF:
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_2
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_1
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_0
c  in DIMACS:
-10247  10248 -10249 -112 -10250 0
-10247  10248 -10249 -112 -10251 0
-10247  10248 -10249 -112 -10252 0

c  0+1 --> 1
c    (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧  p_112) -> (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0)
c  in CNF:
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_2
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_1
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨  b^{8, 15}_0
c  in DIMACS:
 10247  10248  10249 -112 -10250 0
 10247  10248  10249 -112 -10251 0
 10247  10248  10249 -112  10252 0

c  1+1 --> 2
c    (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0 ∧  p_112) -> (-b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0)
c  in CNF:
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_2
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨  b^{8, 15}_1
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ -p_112 ∨ -b^{8, 15}_0
c  in DIMACS:
 10247  10248 -10249 -112 -10250 0
 10247  10248 -10249 -112  10251 0
 10247  10248 -10249 -112 -10252 0

c  2+1 --> break 
c    (-b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧  p_112) -> break
c  in CNF:
c     b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 10247 -10248  10249 -112 1162 0


c  2-1 --> 1
c    (-b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧ -p_112) -> (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0)
c  in CNF:
c     b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_2
c     b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_1
c     b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨  b^{8, 15}_0
c  in DIMACS:
 10247 -10248  10249  112 -10250 0
 10247 -10248  10249  112 -10251 0
 10247 -10248  10249  112  10252 0

c  1-1 --> 0
c    (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0 ∧ -p_112) -> (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧ -b^{8, 15}_0)
c  in CNF:
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_2
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_1
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_0
c  in DIMACS:
 10247  10248 -10249  112 -10250 0
 10247  10248 -10249  112 -10251 0
 10247  10248 -10249  112 -10252 0

c  0-1 --> -1
c    (-b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧ -p_112) -> ( b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0)
c  in CNF:
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨  b^{8, 15}_2
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_1
c     b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨  b^{8, 15}_0
c  in DIMACS:
 10247  10248  10249  112  10250 0
 10247  10248  10249  112 -10251 0
 10247  10248  10249  112  10252 0

c  -1-1 --> -2
c    ( b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧  b^{8, 14}_0 ∧ -p_112) -> ( b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0)
c  in CNF:
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨  b^{8, 15}_2
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨  b^{8, 15}_1
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨  p_112 ∨ -b^{8, 15}_0
c  in DIMACS:
-10247  10248 -10249  112  10250 0
-10247  10248 -10249  112  10251 0
-10247  10248 -10249  112 -10252 0

c  -2-1 --> break 
c    ( b^{8, 14}_2 ∧  b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨  b^{8, 14}_0 ∨  p_112 ∨ break
c  in DIMACS:
-10247 -10248  10249  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 14}_2 ∧ -b^{8, 14}_1 ∧ -b^{8, 14}_0 ∧ true) 
c  in CNF:
c    -b^{8, 14}_2 ∨  b^{8, 14}_1 ∨  b^{8, 14}_0 ∨ false 
c  in DIMACS:
-10247  10248  10249  0

c  3 does not represent an automaton state.
c    -(-b^{8, 14}_2 ∧  b^{8, 14}_1 ∧  b^{8, 14}_0 ∧ true) 
c  in CNF:
c     b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ false 
c  in DIMACS:
 10247 -10248 -10249  0
c  -3 does not represent an automaton state.
c    -( b^{8, 14}_2 ∧  b^{8, 14}_1 ∧  b^{8, 14}_0 ∧ true) 
c  in CNF:
c    -b^{8, 14}_2 ∨ -b^{8, 14}_1 ∨ -b^{8, 14}_0 ∨ false 
c  in DIMACS:
-10247 -10248 -10249  0

c i = 15
c  -2+1 --> -1
c    ( b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧  p_120) -> ( b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0)
c  in CNF:
c    -b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨  b^{8, 16}_2
c    -b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_1
c    -b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨  b^{8, 16}_0
c  in DIMACS:
-10250 -10251  10252 -120  10253 0
-10250 -10251  10252 -120 -10254 0
-10250 -10251  10252 -120  10255 0

c  -1+1 --> 0
c    ( b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0 ∧  p_120) -> (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧ -b^{8, 16}_0)
c  in CNF:
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_2
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_1
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_0
c  in DIMACS:
-10250  10251 -10252 -120 -10253 0
-10250  10251 -10252 -120 -10254 0
-10250  10251 -10252 -120 -10255 0

c  0+1 --> 1
c    (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧  p_120) -> (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0)
c  in CNF:
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_2
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_1
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨  b^{8, 16}_0
c  in DIMACS:
 10250  10251  10252 -120 -10253 0
 10250  10251  10252 -120 -10254 0
 10250  10251  10252 -120  10255 0

c  1+1 --> 2
c    (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0 ∧  p_120) -> (-b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0)
c  in CNF:
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_2
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨  b^{8, 16}_1
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ -p_120 ∨ -b^{8, 16}_0
c  in DIMACS:
 10250  10251 -10252 -120 -10253 0
 10250  10251 -10252 -120  10254 0
 10250  10251 -10252 -120 -10255 0

c  2+1 --> break 
c    (-b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧  p_120) -> break
c  in CNF:
c     b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 10250 -10251  10252 -120 1162 0


c  2-1 --> 1
c    (-b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧ -p_120) -> (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0)
c  in CNF:
c     b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_2
c     b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_1
c     b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨  b^{8, 16}_0
c  in DIMACS:
 10250 -10251  10252  120 -10253 0
 10250 -10251  10252  120 -10254 0
 10250 -10251  10252  120  10255 0

c  1-1 --> 0
c    (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0 ∧ -p_120) -> (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧ -b^{8, 16}_0)
c  in CNF:
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_2
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_1
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_0
c  in DIMACS:
 10250  10251 -10252  120 -10253 0
 10250  10251 -10252  120 -10254 0
 10250  10251 -10252  120 -10255 0

c  0-1 --> -1
c    (-b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧ -p_120) -> ( b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0)
c  in CNF:
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨  b^{8, 16}_2
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_1
c     b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨  b^{8, 16}_0
c  in DIMACS:
 10250  10251  10252  120  10253 0
 10250  10251  10252  120 -10254 0
 10250  10251  10252  120  10255 0

c  -1-1 --> -2
c    ( b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧  b^{8, 15}_0 ∧ -p_120) -> ( b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0)
c  in CNF:
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨  b^{8, 16}_2
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨  b^{8, 16}_1
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨  p_120 ∨ -b^{8, 16}_0
c  in DIMACS:
-10250  10251 -10252  120  10253 0
-10250  10251 -10252  120  10254 0
-10250  10251 -10252  120 -10255 0

c  -2-1 --> break 
c    ( b^{8, 15}_2 ∧  b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨  b^{8, 15}_0 ∨  p_120 ∨ break
c  in DIMACS:
-10250 -10251  10252  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 15}_2 ∧ -b^{8, 15}_1 ∧ -b^{8, 15}_0 ∧ true) 
c  in CNF:
c    -b^{8, 15}_2 ∨  b^{8, 15}_1 ∨  b^{8, 15}_0 ∨ false 
c  in DIMACS:
-10250  10251  10252  0

c  3 does not represent an automaton state.
c    -(-b^{8, 15}_2 ∧  b^{8, 15}_1 ∧  b^{8, 15}_0 ∧ true) 
c  in CNF:
c     b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ false 
c  in DIMACS:
 10250 -10251 -10252  0
c  -3 does not represent an automaton state.
c    -( b^{8, 15}_2 ∧  b^{8, 15}_1 ∧  b^{8, 15}_0 ∧ true) 
c  in CNF:
c    -b^{8, 15}_2 ∨ -b^{8, 15}_1 ∨ -b^{8, 15}_0 ∨ false 
c  in DIMACS:
-10250 -10251 -10252  0

c i = 16
c  -2+1 --> -1
c    ( b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧  p_128) -> ( b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0)
c  in CNF:
c    -b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨  b^{8, 17}_2
c    -b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_1
c    -b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨  b^{8, 17}_0
c  in DIMACS:
-10253 -10254  10255 -128  10256 0
-10253 -10254  10255 -128 -10257 0
-10253 -10254  10255 -128  10258 0

c  -1+1 --> 0
c    ( b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0 ∧  p_128) -> (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧ -b^{8, 17}_0)
c  in CNF:
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_2
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_1
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_0
c  in DIMACS:
-10253  10254 -10255 -128 -10256 0
-10253  10254 -10255 -128 -10257 0
-10253  10254 -10255 -128 -10258 0

c  0+1 --> 1
c    (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧  p_128) -> (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0)
c  in CNF:
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_2
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_1
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨  b^{8, 17}_0
c  in DIMACS:
 10253  10254  10255 -128 -10256 0
 10253  10254  10255 -128 -10257 0
 10253  10254  10255 -128  10258 0

c  1+1 --> 2
c    (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0 ∧  p_128) -> (-b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0)
c  in CNF:
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_2
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨  b^{8, 17}_1
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ -p_128 ∨ -b^{8, 17}_0
c  in DIMACS:
 10253  10254 -10255 -128 -10256 0
 10253  10254 -10255 -128  10257 0
 10253  10254 -10255 -128 -10258 0

c  2+1 --> break 
c    (-b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧  p_128) -> break
c  in CNF:
c     b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 10253 -10254  10255 -128 1162 0


c  2-1 --> 1
c    (-b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧ -p_128) -> (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0)
c  in CNF:
c     b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_2
c     b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_1
c     b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨  b^{8, 17}_0
c  in DIMACS:
 10253 -10254  10255  128 -10256 0
 10253 -10254  10255  128 -10257 0
 10253 -10254  10255  128  10258 0

c  1-1 --> 0
c    (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0 ∧ -p_128) -> (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧ -b^{8, 17}_0)
c  in CNF:
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_2
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_1
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_0
c  in DIMACS:
 10253  10254 -10255  128 -10256 0
 10253  10254 -10255  128 -10257 0
 10253  10254 -10255  128 -10258 0

c  0-1 --> -1
c    (-b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧ -p_128) -> ( b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0)
c  in CNF:
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨  b^{8, 17}_2
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_1
c     b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨  b^{8, 17}_0
c  in DIMACS:
 10253  10254  10255  128  10256 0
 10253  10254  10255  128 -10257 0
 10253  10254  10255  128  10258 0

c  -1-1 --> -2
c    ( b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧  b^{8, 16}_0 ∧ -p_128) -> ( b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0)
c  in CNF:
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨  b^{8, 17}_2
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨  b^{8, 17}_1
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨  p_128 ∨ -b^{8, 17}_0
c  in DIMACS:
-10253  10254 -10255  128  10256 0
-10253  10254 -10255  128  10257 0
-10253  10254 -10255  128 -10258 0

c  -2-1 --> break 
c    ( b^{8, 16}_2 ∧  b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨  b^{8, 16}_0 ∨  p_128 ∨ break
c  in DIMACS:
-10253 -10254  10255  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 16}_2 ∧ -b^{8, 16}_1 ∧ -b^{8, 16}_0 ∧ true) 
c  in CNF:
c    -b^{8, 16}_2 ∨  b^{8, 16}_1 ∨  b^{8, 16}_0 ∨ false 
c  in DIMACS:
-10253  10254  10255  0

c  3 does not represent an automaton state.
c    -(-b^{8, 16}_2 ∧  b^{8, 16}_1 ∧  b^{8, 16}_0 ∧ true) 
c  in CNF:
c     b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ false 
c  in DIMACS:
 10253 -10254 -10255  0
c  -3 does not represent an automaton state.
c    -( b^{8, 16}_2 ∧  b^{8, 16}_1 ∧  b^{8, 16}_0 ∧ true) 
c  in CNF:
c    -b^{8, 16}_2 ∨ -b^{8, 16}_1 ∨ -b^{8, 16}_0 ∨ false 
c  in DIMACS:
-10253 -10254 -10255  0

c i = 17
c  -2+1 --> -1
c    ( b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧  p_136) -> ( b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0)
c  in CNF:
c    -b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨  b^{8, 18}_2
c    -b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_1
c    -b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨  b^{8, 18}_0
c  in DIMACS:
-10256 -10257  10258 -136  10259 0
-10256 -10257  10258 -136 -10260 0
-10256 -10257  10258 -136  10261 0

c  -1+1 --> 0
c    ( b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0 ∧  p_136) -> (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧ -b^{8, 18}_0)
c  in CNF:
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_2
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_1
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_0
c  in DIMACS:
-10256  10257 -10258 -136 -10259 0
-10256  10257 -10258 -136 -10260 0
-10256  10257 -10258 -136 -10261 0

c  0+1 --> 1
c    (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧  p_136) -> (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0)
c  in CNF:
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_2
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_1
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨  b^{8, 18}_0
c  in DIMACS:
 10256  10257  10258 -136 -10259 0
 10256  10257  10258 -136 -10260 0
 10256  10257  10258 -136  10261 0

c  1+1 --> 2
c    (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0 ∧  p_136) -> (-b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0)
c  in CNF:
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_2
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨  b^{8, 18}_1
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ -p_136 ∨ -b^{8, 18}_0
c  in DIMACS:
 10256  10257 -10258 -136 -10259 0
 10256  10257 -10258 -136  10260 0
 10256  10257 -10258 -136 -10261 0

c  2+1 --> break 
c    (-b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧  p_136) -> break
c  in CNF:
c     b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 10256 -10257  10258 -136 1162 0


c  2-1 --> 1
c    (-b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧ -p_136) -> (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0)
c  in CNF:
c     b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_2
c     b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_1
c     b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨  b^{8, 18}_0
c  in DIMACS:
 10256 -10257  10258  136 -10259 0
 10256 -10257  10258  136 -10260 0
 10256 -10257  10258  136  10261 0

c  1-1 --> 0
c    (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0 ∧ -p_136) -> (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧ -b^{8, 18}_0)
c  in CNF:
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_2
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_1
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_0
c  in DIMACS:
 10256  10257 -10258  136 -10259 0
 10256  10257 -10258  136 -10260 0
 10256  10257 -10258  136 -10261 0

c  0-1 --> -1
c    (-b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧ -p_136) -> ( b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0)
c  in CNF:
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨  b^{8, 18}_2
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_1
c     b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨  b^{8, 18}_0
c  in DIMACS:
 10256  10257  10258  136  10259 0
 10256  10257  10258  136 -10260 0
 10256  10257  10258  136  10261 0

c  -1-1 --> -2
c    ( b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧  b^{8, 17}_0 ∧ -p_136) -> ( b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0)
c  in CNF:
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨  b^{8, 18}_2
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨  b^{8, 18}_1
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨  p_136 ∨ -b^{8, 18}_0
c  in DIMACS:
-10256  10257 -10258  136  10259 0
-10256  10257 -10258  136  10260 0
-10256  10257 -10258  136 -10261 0

c  -2-1 --> break 
c    ( b^{8, 17}_2 ∧  b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨  b^{8, 17}_0 ∨  p_136 ∨ break
c  in DIMACS:
-10256 -10257  10258  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 17}_2 ∧ -b^{8, 17}_1 ∧ -b^{8, 17}_0 ∧ true) 
c  in CNF:
c    -b^{8, 17}_2 ∨  b^{8, 17}_1 ∨  b^{8, 17}_0 ∨ false 
c  in DIMACS:
-10256  10257  10258  0

c  3 does not represent an automaton state.
c    -(-b^{8, 17}_2 ∧  b^{8, 17}_1 ∧  b^{8, 17}_0 ∧ true) 
c  in CNF:
c     b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ false 
c  in DIMACS:
 10256 -10257 -10258  0
c  -3 does not represent an automaton state.
c    -( b^{8, 17}_2 ∧  b^{8, 17}_1 ∧  b^{8, 17}_0 ∧ true) 
c  in CNF:
c    -b^{8, 17}_2 ∨ -b^{8, 17}_1 ∨ -b^{8, 17}_0 ∨ false 
c  in DIMACS:
-10256 -10257 -10258  0

c i = 18
c  -2+1 --> -1
c    ( b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧  p_144) -> ( b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0)
c  in CNF:
c    -b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨  b^{8, 19}_2
c    -b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_1
c    -b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨  b^{8, 19}_0
c  in DIMACS:
-10259 -10260  10261 -144  10262 0
-10259 -10260  10261 -144 -10263 0
-10259 -10260  10261 -144  10264 0

c  -1+1 --> 0
c    ( b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0 ∧  p_144) -> (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧ -b^{8, 19}_0)
c  in CNF:
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_2
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_1
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_0
c  in DIMACS:
-10259  10260 -10261 -144 -10262 0
-10259  10260 -10261 -144 -10263 0
-10259  10260 -10261 -144 -10264 0

c  0+1 --> 1
c    (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧  p_144) -> (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0)
c  in CNF:
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_2
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_1
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨  b^{8, 19}_0
c  in DIMACS:
 10259  10260  10261 -144 -10262 0
 10259  10260  10261 -144 -10263 0
 10259  10260  10261 -144  10264 0

c  1+1 --> 2
c    (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0 ∧  p_144) -> (-b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0)
c  in CNF:
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_2
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨  b^{8, 19}_1
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ -p_144 ∨ -b^{8, 19}_0
c  in DIMACS:
 10259  10260 -10261 -144 -10262 0
 10259  10260 -10261 -144  10263 0
 10259  10260 -10261 -144 -10264 0

c  2+1 --> break 
c    (-b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧  p_144) -> break
c  in CNF:
c     b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 10259 -10260  10261 -144 1162 0


c  2-1 --> 1
c    (-b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧ -p_144) -> (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0)
c  in CNF:
c     b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_2
c     b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_1
c     b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨  b^{8, 19}_0
c  in DIMACS:
 10259 -10260  10261  144 -10262 0
 10259 -10260  10261  144 -10263 0
 10259 -10260  10261  144  10264 0

c  1-1 --> 0
c    (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0 ∧ -p_144) -> (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧ -b^{8, 19}_0)
c  in CNF:
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_2
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_1
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_0
c  in DIMACS:
 10259  10260 -10261  144 -10262 0
 10259  10260 -10261  144 -10263 0
 10259  10260 -10261  144 -10264 0

c  0-1 --> -1
c    (-b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧ -p_144) -> ( b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0)
c  in CNF:
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨  b^{8, 19}_2
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_1
c     b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨  b^{8, 19}_0
c  in DIMACS:
 10259  10260  10261  144  10262 0
 10259  10260  10261  144 -10263 0
 10259  10260  10261  144  10264 0

c  -1-1 --> -2
c    ( b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧  b^{8, 18}_0 ∧ -p_144) -> ( b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0)
c  in CNF:
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨  b^{8, 19}_2
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨  b^{8, 19}_1
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨  p_144 ∨ -b^{8, 19}_0
c  in DIMACS:
-10259  10260 -10261  144  10262 0
-10259  10260 -10261  144  10263 0
-10259  10260 -10261  144 -10264 0

c  -2-1 --> break 
c    ( b^{8, 18}_2 ∧  b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨  b^{8, 18}_0 ∨  p_144 ∨ break
c  in DIMACS:
-10259 -10260  10261  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 18}_2 ∧ -b^{8, 18}_1 ∧ -b^{8, 18}_0 ∧ true) 
c  in CNF:
c    -b^{8, 18}_2 ∨  b^{8, 18}_1 ∨  b^{8, 18}_0 ∨ false 
c  in DIMACS:
-10259  10260  10261  0

c  3 does not represent an automaton state.
c    -(-b^{8, 18}_2 ∧  b^{8, 18}_1 ∧  b^{8, 18}_0 ∧ true) 
c  in CNF:
c     b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ false 
c  in DIMACS:
 10259 -10260 -10261  0
c  -3 does not represent an automaton state.
c    -( b^{8, 18}_2 ∧  b^{8, 18}_1 ∧  b^{8, 18}_0 ∧ true) 
c  in CNF:
c    -b^{8, 18}_2 ∨ -b^{8, 18}_1 ∨ -b^{8, 18}_0 ∨ false 
c  in DIMACS:
-10259 -10260 -10261  0

c i = 19
c  -2+1 --> -1
c    ( b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧  p_152) -> ( b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0)
c  in CNF:
c    -b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨  b^{8, 20}_2
c    -b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_1
c    -b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨  b^{8, 20}_0
c  in DIMACS:
-10262 -10263  10264 -152  10265 0
-10262 -10263  10264 -152 -10266 0
-10262 -10263  10264 -152  10267 0

c  -1+1 --> 0
c    ( b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0 ∧  p_152) -> (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧ -b^{8, 20}_0)
c  in CNF:
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_2
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_1
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_0
c  in DIMACS:
-10262  10263 -10264 -152 -10265 0
-10262  10263 -10264 -152 -10266 0
-10262  10263 -10264 -152 -10267 0

c  0+1 --> 1
c    (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧  p_152) -> (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0)
c  in CNF:
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_2
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_1
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨  b^{8, 20}_0
c  in DIMACS:
 10262  10263  10264 -152 -10265 0
 10262  10263  10264 -152 -10266 0
 10262  10263  10264 -152  10267 0

c  1+1 --> 2
c    (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0 ∧  p_152) -> (-b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0)
c  in CNF:
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_2
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨  b^{8, 20}_1
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ -p_152 ∨ -b^{8, 20}_0
c  in DIMACS:
 10262  10263 -10264 -152 -10265 0
 10262  10263 -10264 -152  10266 0
 10262  10263 -10264 -152 -10267 0

c  2+1 --> break 
c    (-b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧  p_152) -> break
c  in CNF:
c     b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 10262 -10263  10264 -152 1162 0


c  2-1 --> 1
c    (-b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧ -p_152) -> (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0)
c  in CNF:
c     b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_2
c     b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_1
c     b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨  b^{8, 20}_0
c  in DIMACS:
 10262 -10263  10264  152 -10265 0
 10262 -10263  10264  152 -10266 0
 10262 -10263  10264  152  10267 0

c  1-1 --> 0
c    (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0 ∧ -p_152) -> (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧ -b^{8, 20}_0)
c  in CNF:
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_2
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_1
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_0
c  in DIMACS:
 10262  10263 -10264  152 -10265 0
 10262  10263 -10264  152 -10266 0
 10262  10263 -10264  152 -10267 0

c  0-1 --> -1
c    (-b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧ -p_152) -> ( b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0)
c  in CNF:
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨  b^{8, 20}_2
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_1
c     b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨  b^{8, 20}_0
c  in DIMACS:
 10262  10263  10264  152  10265 0
 10262  10263  10264  152 -10266 0
 10262  10263  10264  152  10267 0

c  -1-1 --> -2
c    ( b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧  b^{8, 19}_0 ∧ -p_152) -> ( b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0)
c  in CNF:
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨  b^{8, 20}_2
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨  b^{8, 20}_1
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨  p_152 ∨ -b^{8, 20}_0
c  in DIMACS:
-10262  10263 -10264  152  10265 0
-10262  10263 -10264  152  10266 0
-10262  10263 -10264  152 -10267 0

c  -2-1 --> break 
c    ( b^{8, 19}_2 ∧  b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨  b^{8, 19}_0 ∨  p_152 ∨ break
c  in DIMACS:
-10262 -10263  10264  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 19}_2 ∧ -b^{8, 19}_1 ∧ -b^{8, 19}_0 ∧ true) 
c  in CNF:
c    -b^{8, 19}_2 ∨  b^{8, 19}_1 ∨  b^{8, 19}_0 ∨ false 
c  in DIMACS:
-10262  10263  10264  0

c  3 does not represent an automaton state.
c    -(-b^{8, 19}_2 ∧  b^{8, 19}_1 ∧  b^{8, 19}_0 ∧ true) 
c  in CNF:
c     b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ false 
c  in DIMACS:
 10262 -10263 -10264  0
c  -3 does not represent an automaton state.
c    -( b^{8, 19}_2 ∧  b^{8, 19}_1 ∧  b^{8, 19}_0 ∧ true) 
c  in CNF:
c    -b^{8, 19}_2 ∨ -b^{8, 19}_1 ∨ -b^{8, 19}_0 ∨ false 
c  in DIMACS:
-10262 -10263 -10264  0

c i = 20
c  -2+1 --> -1
c    ( b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧  p_160) -> ( b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0)
c  in CNF:
c    -b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨  b^{8, 21}_2
c    -b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_1
c    -b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨  b^{8, 21}_0
c  in DIMACS:
-10265 -10266  10267 -160  10268 0
-10265 -10266  10267 -160 -10269 0
-10265 -10266  10267 -160  10270 0

c  -1+1 --> 0
c    ( b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0 ∧  p_160) -> (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧ -b^{8, 21}_0)
c  in CNF:
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_2
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_1
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_0
c  in DIMACS:
-10265  10266 -10267 -160 -10268 0
-10265  10266 -10267 -160 -10269 0
-10265  10266 -10267 -160 -10270 0

c  0+1 --> 1
c    (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧  p_160) -> (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0)
c  in CNF:
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_2
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_1
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨  b^{8, 21}_0
c  in DIMACS:
 10265  10266  10267 -160 -10268 0
 10265  10266  10267 -160 -10269 0
 10265  10266  10267 -160  10270 0

c  1+1 --> 2
c    (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0 ∧  p_160) -> (-b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0)
c  in CNF:
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_2
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨  b^{8, 21}_1
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ -p_160 ∨ -b^{8, 21}_0
c  in DIMACS:
 10265  10266 -10267 -160 -10268 0
 10265  10266 -10267 -160  10269 0
 10265  10266 -10267 -160 -10270 0

c  2+1 --> break 
c    (-b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧  p_160) -> break
c  in CNF:
c     b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 10265 -10266  10267 -160 1162 0


c  2-1 --> 1
c    (-b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧ -p_160) -> (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0)
c  in CNF:
c     b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_2
c     b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_1
c     b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨  b^{8, 21}_0
c  in DIMACS:
 10265 -10266  10267  160 -10268 0
 10265 -10266  10267  160 -10269 0
 10265 -10266  10267  160  10270 0

c  1-1 --> 0
c    (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0 ∧ -p_160) -> (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧ -b^{8, 21}_0)
c  in CNF:
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_2
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_1
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_0
c  in DIMACS:
 10265  10266 -10267  160 -10268 0
 10265  10266 -10267  160 -10269 0
 10265  10266 -10267  160 -10270 0

c  0-1 --> -1
c    (-b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧ -p_160) -> ( b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0)
c  in CNF:
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨  b^{8, 21}_2
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_1
c     b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨  b^{8, 21}_0
c  in DIMACS:
 10265  10266  10267  160  10268 0
 10265  10266  10267  160 -10269 0
 10265  10266  10267  160  10270 0

c  -1-1 --> -2
c    ( b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧  b^{8, 20}_0 ∧ -p_160) -> ( b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0)
c  in CNF:
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨  b^{8, 21}_2
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨  b^{8, 21}_1
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨  p_160 ∨ -b^{8, 21}_0
c  in DIMACS:
-10265  10266 -10267  160  10268 0
-10265  10266 -10267  160  10269 0
-10265  10266 -10267  160 -10270 0

c  -2-1 --> break 
c    ( b^{8, 20}_2 ∧  b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨  b^{8, 20}_0 ∨  p_160 ∨ break
c  in DIMACS:
-10265 -10266  10267  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 20}_2 ∧ -b^{8, 20}_1 ∧ -b^{8, 20}_0 ∧ true) 
c  in CNF:
c    -b^{8, 20}_2 ∨  b^{8, 20}_1 ∨  b^{8, 20}_0 ∨ false 
c  in DIMACS:
-10265  10266  10267  0

c  3 does not represent an automaton state.
c    -(-b^{8, 20}_2 ∧  b^{8, 20}_1 ∧  b^{8, 20}_0 ∧ true) 
c  in CNF:
c     b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ false 
c  in DIMACS:
 10265 -10266 -10267  0
c  -3 does not represent an automaton state.
c    -( b^{8, 20}_2 ∧  b^{8, 20}_1 ∧  b^{8, 20}_0 ∧ true) 
c  in CNF:
c    -b^{8, 20}_2 ∨ -b^{8, 20}_1 ∨ -b^{8, 20}_0 ∨ false 
c  in DIMACS:
-10265 -10266 -10267  0

c i = 21
c  -2+1 --> -1
c    ( b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧  p_168) -> ( b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0)
c  in CNF:
c    -b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨  b^{8, 22}_2
c    -b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_1
c    -b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨  b^{8, 22}_0
c  in DIMACS:
-10268 -10269  10270 -168  10271 0
-10268 -10269  10270 -168 -10272 0
-10268 -10269  10270 -168  10273 0

c  -1+1 --> 0
c    ( b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0 ∧  p_168) -> (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧ -b^{8, 22}_0)
c  in CNF:
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_2
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_1
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_0
c  in DIMACS:
-10268  10269 -10270 -168 -10271 0
-10268  10269 -10270 -168 -10272 0
-10268  10269 -10270 -168 -10273 0

c  0+1 --> 1
c    (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧  p_168) -> (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0)
c  in CNF:
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_2
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_1
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨  b^{8, 22}_0
c  in DIMACS:
 10268  10269  10270 -168 -10271 0
 10268  10269  10270 -168 -10272 0
 10268  10269  10270 -168  10273 0

c  1+1 --> 2
c    (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0 ∧  p_168) -> (-b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0)
c  in CNF:
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_2
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨  b^{8, 22}_1
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ -p_168 ∨ -b^{8, 22}_0
c  in DIMACS:
 10268  10269 -10270 -168 -10271 0
 10268  10269 -10270 -168  10272 0
 10268  10269 -10270 -168 -10273 0

c  2+1 --> break 
c    (-b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧  p_168) -> break
c  in CNF:
c     b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 10268 -10269  10270 -168 1162 0


c  2-1 --> 1
c    (-b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧ -p_168) -> (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0)
c  in CNF:
c     b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_2
c     b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_1
c     b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨  b^{8, 22}_0
c  in DIMACS:
 10268 -10269  10270  168 -10271 0
 10268 -10269  10270  168 -10272 0
 10268 -10269  10270  168  10273 0

c  1-1 --> 0
c    (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0 ∧ -p_168) -> (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧ -b^{8, 22}_0)
c  in CNF:
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_2
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_1
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_0
c  in DIMACS:
 10268  10269 -10270  168 -10271 0
 10268  10269 -10270  168 -10272 0
 10268  10269 -10270  168 -10273 0

c  0-1 --> -1
c    (-b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧ -p_168) -> ( b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0)
c  in CNF:
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨  b^{8, 22}_2
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_1
c     b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨  b^{8, 22}_0
c  in DIMACS:
 10268  10269  10270  168  10271 0
 10268  10269  10270  168 -10272 0
 10268  10269  10270  168  10273 0

c  -1-1 --> -2
c    ( b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧  b^{8, 21}_0 ∧ -p_168) -> ( b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0)
c  in CNF:
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨  b^{8, 22}_2
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨  b^{8, 22}_1
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨  p_168 ∨ -b^{8, 22}_0
c  in DIMACS:
-10268  10269 -10270  168  10271 0
-10268  10269 -10270  168  10272 0
-10268  10269 -10270  168 -10273 0

c  -2-1 --> break 
c    ( b^{8, 21}_2 ∧  b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨  b^{8, 21}_0 ∨  p_168 ∨ break
c  in DIMACS:
-10268 -10269  10270  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 21}_2 ∧ -b^{8, 21}_1 ∧ -b^{8, 21}_0 ∧ true) 
c  in CNF:
c    -b^{8, 21}_2 ∨  b^{8, 21}_1 ∨  b^{8, 21}_0 ∨ false 
c  in DIMACS:
-10268  10269  10270  0

c  3 does not represent an automaton state.
c    -(-b^{8, 21}_2 ∧  b^{8, 21}_1 ∧  b^{8, 21}_0 ∧ true) 
c  in CNF:
c     b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ false 
c  in DIMACS:
 10268 -10269 -10270  0
c  -3 does not represent an automaton state.
c    -( b^{8, 21}_2 ∧  b^{8, 21}_1 ∧  b^{8, 21}_0 ∧ true) 
c  in CNF:
c    -b^{8, 21}_2 ∨ -b^{8, 21}_1 ∨ -b^{8, 21}_0 ∨ false 
c  in DIMACS:
-10268 -10269 -10270  0

c i = 22
c  -2+1 --> -1
c    ( b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧  p_176) -> ( b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0)
c  in CNF:
c    -b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨  b^{8, 23}_2
c    -b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_1
c    -b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨  b^{8, 23}_0
c  in DIMACS:
-10271 -10272  10273 -176  10274 0
-10271 -10272  10273 -176 -10275 0
-10271 -10272  10273 -176  10276 0

c  -1+1 --> 0
c    ( b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0 ∧  p_176) -> (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧ -b^{8, 23}_0)
c  in CNF:
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_2
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_1
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_0
c  in DIMACS:
-10271  10272 -10273 -176 -10274 0
-10271  10272 -10273 -176 -10275 0
-10271  10272 -10273 -176 -10276 0

c  0+1 --> 1
c    (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧  p_176) -> (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0)
c  in CNF:
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_2
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_1
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨  b^{8, 23}_0
c  in DIMACS:
 10271  10272  10273 -176 -10274 0
 10271  10272  10273 -176 -10275 0
 10271  10272  10273 -176  10276 0

c  1+1 --> 2
c    (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0 ∧  p_176) -> (-b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0)
c  in CNF:
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_2
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨  b^{8, 23}_1
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ -p_176 ∨ -b^{8, 23}_0
c  in DIMACS:
 10271  10272 -10273 -176 -10274 0
 10271  10272 -10273 -176  10275 0
 10271  10272 -10273 -176 -10276 0

c  2+1 --> break 
c    (-b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧  p_176) -> break
c  in CNF:
c     b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 10271 -10272  10273 -176 1162 0


c  2-1 --> 1
c    (-b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧ -p_176) -> (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0)
c  in CNF:
c     b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_2
c     b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_1
c     b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨  b^{8, 23}_0
c  in DIMACS:
 10271 -10272  10273  176 -10274 0
 10271 -10272  10273  176 -10275 0
 10271 -10272  10273  176  10276 0

c  1-1 --> 0
c    (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0 ∧ -p_176) -> (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧ -b^{8, 23}_0)
c  in CNF:
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_2
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_1
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_0
c  in DIMACS:
 10271  10272 -10273  176 -10274 0
 10271  10272 -10273  176 -10275 0
 10271  10272 -10273  176 -10276 0

c  0-1 --> -1
c    (-b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧ -p_176) -> ( b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0)
c  in CNF:
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨  b^{8, 23}_2
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_1
c     b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨  b^{8, 23}_0
c  in DIMACS:
 10271  10272  10273  176  10274 0
 10271  10272  10273  176 -10275 0
 10271  10272  10273  176  10276 0

c  -1-1 --> -2
c    ( b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧  b^{8, 22}_0 ∧ -p_176) -> ( b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0)
c  in CNF:
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨  b^{8, 23}_2
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨  b^{8, 23}_1
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨  p_176 ∨ -b^{8, 23}_0
c  in DIMACS:
-10271  10272 -10273  176  10274 0
-10271  10272 -10273  176  10275 0
-10271  10272 -10273  176 -10276 0

c  -2-1 --> break 
c    ( b^{8, 22}_2 ∧  b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨  b^{8, 22}_0 ∨  p_176 ∨ break
c  in DIMACS:
-10271 -10272  10273  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 22}_2 ∧ -b^{8, 22}_1 ∧ -b^{8, 22}_0 ∧ true) 
c  in CNF:
c    -b^{8, 22}_2 ∨  b^{8, 22}_1 ∨  b^{8, 22}_0 ∨ false 
c  in DIMACS:
-10271  10272  10273  0

c  3 does not represent an automaton state.
c    -(-b^{8, 22}_2 ∧  b^{8, 22}_1 ∧  b^{8, 22}_0 ∧ true) 
c  in CNF:
c     b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ false 
c  in DIMACS:
 10271 -10272 -10273  0
c  -3 does not represent an automaton state.
c    -( b^{8, 22}_2 ∧  b^{8, 22}_1 ∧  b^{8, 22}_0 ∧ true) 
c  in CNF:
c    -b^{8, 22}_2 ∨ -b^{8, 22}_1 ∨ -b^{8, 22}_0 ∨ false 
c  in DIMACS:
-10271 -10272 -10273  0

c i = 23
c  -2+1 --> -1
c    ( b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧  p_184) -> ( b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0)
c  in CNF:
c    -b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨  b^{8, 24}_2
c    -b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_1
c    -b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨  b^{8, 24}_0
c  in DIMACS:
-10274 -10275  10276 -184  10277 0
-10274 -10275  10276 -184 -10278 0
-10274 -10275  10276 -184  10279 0

c  -1+1 --> 0
c    ( b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0 ∧  p_184) -> (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧ -b^{8, 24}_0)
c  in CNF:
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_2
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_1
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_0
c  in DIMACS:
-10274  10275 -10276 -184 -10277 0
-10274  10275 -10276 -184 -10278 0
-10274  10275 -10276 -184 -10279 0

c  0+1 --> 1
c    (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧  p_184) -> (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0)
c  in CNF:
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_2
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_1
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨  b^{8, 24}_0
c  in DIMACS:
 10274  10275  10276 -184 -10277 0
 10274  10275  10276 -184 -10278 0
 10274  10275  10276 -184  10279 0

c  1+1 --> 2
c    (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0 ∧  p_184) -> (-b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0)
c  in CNF:
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_2
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨  b^{8, 24}_1
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ -p_184 ∨ -b^{8, 24}_0
c  in DIMACS:
 10274  10275 -10276 -184 -10277 0
 10274  10275 -10276 -184  10278 0
 10274  10275 -10276 -184 -10279 0

c  2+1 --> break 
c    (-b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧  p_184) -> break
c  in CNF:
c     b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 10274 -10275  10276 -184 1162 0


c  2-1 --> 1
c    (-b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧ -p_184) -> (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0)
c  in CNF:
c     b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_2
c     b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_1
c     b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨  b^{8, 24}_0
c  in DIMACS:
 10274 -10275  10276  184 -10277 0
 10274 -10275  10276  184 -10278 0
 10274 -10275  10276  184  10279 0

c  1-1 --> 0
c    (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0 ∧ -p_184) -> (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧ -b^{8, 24}_0)
c  in CNF:
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_2
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_1
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_0
c  in DIMACS:
 10274  10275 -10276  184 -10277 0
 10274  10275 -10276  184 -10278 0
 10274  10275 -10276  184 -10279 0

c  0-1 --> -1
c    (-b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧ -p_184) -> ( b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0)
c  in CNF:
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨  b^{8, 24}_2
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_1
c     b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨  b^{8, 24}_0
c  in DIMACS:
 10274  10275  10276  184  10277 0
 10274  10275  10276  184 -10278 0
 10274  10275  10276  184  10279 0

c  -1-1 --> -2
c    ( b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧  b^{8, 23}_0 ∧ -p_184) -> ( b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0)
c  in CNF:
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨  b^{8, 24}_2
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨  b^{8, 24}_1
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨  p_184 ∨ -b^{8, 24}_0
c  in DIMACS:
-10274  10275 -10276  184  10277 0
-10274  10275 -10276  184  10278 0
-10274  10275 -10276  184 -10279 0

c  -2-1 --> break 
c    ( b^{8, 23}_2 ∧  b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨  b^{8, 23}_0 ∨  p_184 ∨ break
c  in DIMACS:
-10274 -10275  10276  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 23}_2 ∧ -b^{8, 23}_1 ∧ -b^{8, 23}_0 ∧ true) 
c  in CNF:
c    -b^{8, 23}_2 ∨  b^{8, 23}_1 ∨  b^{8, 23}_0 ∨ false 
c  in DIMACS:
-10274  10275  10276  0

c  3 does not represent an automaton state.
c    -(-b^{8, 23}_2 ∧  b^{8, 23}_1 ∧  b^{8, 23}_0 ∧ true) 
c  in CNF:
c     b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ false 
c  in DIMACS:
 10274 -10275 -10276  0
c  -3 does not represent an automaton state.
c    -( b^{8, 23}_2 ∧  b^{8, 23}_1 ∧  b^{8, 23}_0 ∧ true) 
c  in CNF:
c    -b^{8, 23}_2 ∨ -b^{8, 23}_1 ∨ -b^{8, 23}_0 ∨ false 
c  in DIMACS:
-10274 -10275 -10276  0

c i = 24
c  -2+1 --> -1
c    ( b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧  p_192) -> ( b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0)
c  in CNF:
c    -b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨  b^{8, 25}_2
c    -b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_1
c    -b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨  b^{8, 25}_0
c  in DIMACS:
-10277 -10278  10279 -192  10280 0
-10277 -10278  10279 -192 -10281 0
-10277 -10278  10279 -192  10282 0

c  -1+1 --> 0
c    ( b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0 ∧  p_192) -> (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧ -b^{8, 25}_0)
c  in CNF:
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_2
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_1
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_0
c  in DIMACS:
-10277  10278 -10279 -192 -10280 0
-10277  10278 -10279 -192 -10281 0
-10277  10278 -10279 -192 -10282 0

c  0+1 --> 1
c    (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧  p_192) -> (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0)
c  in CNF:
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_2
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_1
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨  b^{8, 25}_0
c  in DIMACS:
 10277  10278  10279 -192 -10280 0
 10277  10278  10279 -192 -10281 0
 10277  10278  10279 -192  10282 0

c  1+1 --> 2
c    (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0 ∧  p_192) -> (-b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0)
c  in CNF:
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_2
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨  b^{8, 25}_1
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ -p_192 ∨ -b^{8, 25}_0
c  in DIMACS:
 10277  10278 -10279 -192 -10280 0
 10277  10278 -10279 -192  10281 0
 10277  10278 -10279 -192 -10282 0

c  2+1 --> break 
c    (-b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧  p_192) -> break
c  in CNF:
c     b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 10277 -10278  10279 -192 1162 0


c  2-1 --> 1
c    (-b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧ -p_192) -> (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0)
c  in CNF:
c     b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_2
c     b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_1
c     b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨  b^{8, 25}_0
c  in DIMACS:
 10277 -10278  10279  192 -10280 0
 10277 -10278  10279  192 -10281 0
 10277 -10278  10279  192  10282 0

c  1-1 --> 0
c    (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0 ∧ -p_192) -> (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧ -b^{8, 25}_0)
c  in CNF:
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_2
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_1
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_0
c  in DIMACS:
 10277  10278 -10279  192 -10280 0
 10277  10278 -10279  192 -10281 0
 10277  10278 -10279  192 -10282 0

c  0-1 --> -1
c    (-b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧ -p_192) -> ( b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0)
c  in CNF:
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨  b^{8, 25}_2
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_1
c     b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨  b^{8, 25}_0
c  in DIMACS:
 10277  10278  10279  192  10280 0
 10277  10278  10279  192 -10281 0
 10277  10278  10279  192  10282 0

c  -1-1 --> -2
c    ( b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧  b^{8, 24}_0 ∧ -p_192) -> ( b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0)
c  in CNF:
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨  b^{8, 25}_2
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨  b^{8, 25}_1
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨  p_192 ∨ -b^{8, 25}_0
c  in DIMACS:
-10277  10278 -10279  192  10280 0
-10277  10278 -10279  192  10281 0
-10277  10278 -10279  192 -10282 0

c  -2-1 --> break 
c    ( b^{8, 24}_2 ∧  b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨  b^{8, 24}_0 ∨  p_192 ∨ break
c  in DIMACS:
-10277 -10278  10279  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 24}_2 ∧ -b^{8, 24}_1 ∧ -b^{8, 24}_0 ∧ true) 
c  in CNF:
c    -b^{8, 24}_2 ∨  b^{8, 24}_1 ∨  b^{8, 24}_0 ∨ false 
c  in DIMACS:
-10277  10278  10279  0

c  3 does not represent an automaton state.
c    -(-b^{8, 24}_2 ∧  b^{8, 24}_1 ∧  b^{8, 24}_0 ∧ true) 
c  in CNF:
c     b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ false 
c  in DIMACS:
 10277 -10278 -10279  0
c  -3 does not represent an automaton state.
c    -( b^{8, 24}_2 ∧  b^{8, 24}_1 ∧  b^{8, 24}_0 ∧ true) 
c  in CNF:
c    -b^{8, 24}_2 ∨ -b^{8, 24}_1 ∨ -b^{8, 24}_0 ∨ false 
c  in DIMACS:
-10277 -10278 -10279  0

c i = 25
c  -2+1 --> -1
c    ( b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧  p_200) -> ( b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0)
c  in CNF:
c    -b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨  b^{8, 26}_2
c    -b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_1
c    -b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨  b^{8, 26}_0
c  in DIMACS:
-10280 -10281  10282 -200  10283 0
-10280 -10281  10282 -200 -10284 0
-10280 -10281  10282 -200  10285 0

c  -1+1 --> 0
c    ( b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0 ∧  p_200) -> (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧ -b^{8, 26}_0)
c  in CNF:
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_2
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_1
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_0
c  in DIMACS:
-10280  10281 -10282 -200 -10283 0
-10280  10281 -10282 -200 -10284 0
-10280  10281 -10282 -200 -10285 0

c  0+1 --> 1
c    (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧  p_200) -> (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0)
c  in CNF:
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_2
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_1
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨  b^{8, 26}_0
c  in DIMACS:
 10280  10281  10282 -200 -10283 0
 10280  10281  10282 -200 -10284 0
 10280  10281  10282 -200  10285 0

c  1+1 --> 2
c    (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0 ∧  p_200) -> (-b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0)
c  in CNF:
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_2
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨  b^{8, 26}_1
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ -p_200 ∨ -b^{8, 26}_0
c  in DIMACS:
 10280  10281 -10282 -200 -10283 0
 10280  10281 -10282 -200  10284 0
 10280  10281 -10282 -200 -10285 0

c  2+1 --> break 
c    (-b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧  p_200) -> break
c  in CNF:
c     b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 10280 -10281  10282 -200 1162 0


c  2-1 --> 1
c    (-b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧ -p_200) -> (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0)
c  in CNF:
c     b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_2
c     b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_1
c     b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨  b^{8, 26}_0
c  in DIMACS:
 10280 -10281  10282  200 -10283 0
 10280 -10281  10282  200 -10284 0
 10280 -10281  10282  200  10285 0

c  1-1 --> 0
c    (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0 ∧ -p_200) -> (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧ -b^{8, 26}_0)
c  in CNF:
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_2
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_1
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_0
c  in DIMACS:
 10280  10281 -10282  200 -10283 0
 10280  10281 -10282  200 -10284 0
 10280  10281 -10282  200 -10285 0

c  0-1 --> -1
c    (-b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧ -p_200) -> ( b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0)
c  in CNF:
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨  b^{8, 26}_2
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_1
c     b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨  b^{8, 26}_0
c  in DIMACS:
 10280  10281  10282  200  10283 0
 10280  10281  10282  200 -10284 0
 10280  10281  10282  200  10285 0

c  -1-1 --> -2
c    ( b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧  b^{8, 25}_0 ∧ -p_200) -> ( b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0)
c  in CNF:
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨  b^{8, 26}_2
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨  b^{8, 26}_1
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨  p_200 ∨ -b^{8, 26}_0
c  in DIMACS:
-10280  10281 -10282  200  10283 0
-10280  10281 -10282  200  10284 0
-10280  10281 -10282  200 -10285 0

c  -2-1 --> break 
c    ( b^{8, 25}_2 ∧  b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨  b^{8, 25}_0 ∨  p_200 ∨ break
c  in DIMACS:
-10280 -10281  10282  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 25}_2 ∧ -b^{8, 25}_1 ∧ -b^{8, 25}_0 ∧ true) 
c  in CNF:
c    -b^{8, 25}_2 ∨  b^{8, 25}_1 ∨  b^{8, 25}_0 ∨ false 
c  in DIMACS:
-10280  10281  10282  0

c  3 does not represent an automaton state.
c    -(-b^{8, 25}_2 ∧  b^{8, 25}_1 ∧  b^{8, 25}_0 ∧ true) 
c  in CNF:
c     b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ false 
c  in DIMACS:
 10280 -10281 -10282  0
c  -3 does not represent an automaton state.
c    -( b^{8, 25}_2 ∧  b^{8, 25}_1 ∧  b^{8, 25}_0 ∧ true) 
c  in CNF:
c    -b^{8, 25}_2 ∨ -b^{8, 25}_1 ∨ -b^{8, 25}_0 ∨ false 
c  in DIMACS:
-10280 -10281 -10282  0

c i = 26
c  -2+1 --> -1
c    ( b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧  p_208) -> ( b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0)
c  in CNF:
c    -b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨  b^{8, 27}_2
c    -b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_1
c    -b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨  b^{8, 27}_0
c  in DIMACS:
-10283 -10284  10285 -208  10286 0
-10283 -10284  10285 -208 -10287 0
-10283 -10284  10285 -208  10288 0

c  -1+1 --> 0
c    ( b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0 ∧  p_208) -> (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧ -b^{8, 27}_0)
c  in CNF:
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_2
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_1
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_0
c  in DIMACS:
-10283  10284 -10285 -208 -10286 0
-10283  10284 -10285 -208 -10287 0
-10283  10284 -10285 -208 -10288 0

c  0+1 --> 1
c    (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧  p_208) -> (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0)
c  in CNF:
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_2
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_1
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨  b^{8, 27}_0
c  in DIMACS:
 10283  10284  10285 -208 -10286 0
 10283  10284  10285 -208 -10287 0
 10283  10284  10285 -208  10288 0

c  1+1 --> 2
c    (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0 ∧  p_208) -> (-b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0)
c  in CNF:
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_2
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨  b^{8, 27}_1
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ -p_208 ∨ -b^{8, 27}_0
c  in DIMACS:
 10283  10284 -10285 -208 -10286 0
 10283  10284 -10285 -208  10287 0
 10283  10284 -10285 -208 -10288 0

c  2+1 --> break 
c    (-b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧  p_208) -> break
c  in CNF:
c     b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 10283 -10284  10285 -208 1162 0


c  2-1 --> 1
c    (-b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧ -p_208) -> (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0)
c  in CNF:
c     b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_2
c     b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_1
c     b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨  b^{8, 27}_0
c  in DIMACS:
 10283 -10284  10285  208 -10286 0
 10283 -10284  10285  208 -10287 0
 10283 -10284  10285  208  10288 0

c  1-1 --> 0
c    (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0 ∧ -p_208) -> (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧ -b^{8, 27}_0)
c  in CNF:
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_2
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_1
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_0
c  in DIMACS:
 10283  10284 -10285  208 -10286 0
 10283  10284 -10285  208 -10287 0
 10283  10284 -10285  208 -10288 0

c  0-1 --> -1
c    (-b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧ -p_208) -> ( b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0)
c  in CNF:
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨  b^{8, 27}_2
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_1
c     b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨  b^{8, 27}_0
c  in DIMACS:
 10283  10284  10285  208  10286 0
 10283  10284  10285  208 -10287 0
 10283  10284  10285  208  10288 0

c  -1-1 --> -2
c    ( b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧  b^{8, 26}_0 ∧ -p_208) -> ( b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0)
c  in CNF:
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨  b^{8, 27}_2
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨  b^{8, 27}_1
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨  p_208 ∨ -b^{8, 27}_0
c  in DIMACS:
-10283  10284 -10285  208  10286 0
-10283  10284 -10285  208  10287 0
-10283  10284 -10285  208 -10288 0

c  -2-1 --> break 
c    ( b^{8, 26}_2 ∧  b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨  b^{8, 26}_0 ∨  p_208 ∨ break
c  in DIMACS:
-10283 -10284  10285  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 26}_2 ∧ -b^{8, 26}_1 ∧ -b^{8, 26}_0 ∧ true) 
c  in CNF:
c    -b^{8, 26}_2 ∨  b^{8, 26}_1 ∨  b^{8, 26}_0 ∨ false 
c  in DIMACS:
-10283  10284  10285  0

c  3 does not represent an automaton state.
c    -(-b^{8, 26}_2 ∧  b^{8, 26}_1 ∧  b^{8, 26}_0 ∧ true) 
c  in CNF:
c     b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ false 
c  in DIMACS:
 10283 -10284 -10285  0
c  -3 does not represent an automaton state.
c    -( b^{8, 26}_2 ∧  b^{8, 26}_1 ∧  b^{8, 26}_0 ∧ true) 
c  in CNF:
c    -b^{8, 26}_2 ∨ -b^{8, 26}_1 ∨ -b^{8, 26}_0 ∨ false 
c  in DIMACS:
-10283 -10284 -10285  0

c i = 27
c  -2+1 --> -1
c    ( b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧  p_216) -> ( b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0)
c  in CNF:
c    -b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨  b^{8, 28}_2
c    -b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_1
c    -b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨  b^{8, 28}_0
c  in DIMACS:
-10286 -10287  10288 -216  10289 0
-10286 -10287  10288 -216 -10290 0
-10286 -10287  10288 -216  10291 0

c  -1+1 --> 0
c    ( b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0 ∧  p_216) -> (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧ -b^{8, 28}_0)
c  in CNF:
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_2
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_1
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_0
c  in DIMACS:
-10286  10287 -10288 -216 -10289 0
-10286  10287 -10288 -216 -10290 0
-10286  10287 -10288 -216 -10291 0

c  0+1 --> 1
c    (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧  p_216) -> (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0)
c  in CNF:
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_2
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_1
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨  b^{8, 28}_0
c  in DIMACS:
 10286  10287  10288 -216 -10289 0
 10286  10287  10288 -216 -10290 0
 10286  10287  10288 -216  10291 0

c  1+1 --> 2
c    (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0 ∧  p_216) -> (-b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0)
c  in CNF:
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_2
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨  b^{8, 28}_1
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ -p_216 ∨ -b^{8, 28}_0
c  in DIMACS:
 10286  10287 -10288 -216 -10289 0
 10286  10287 -10288 -216  10290 0
 10286  10287 -10288 -216 -10291 0

c  2+1 --> break 
c    (-b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧  p_216) -> break
c  in CNF:
c     b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 10286 -10287  10288 -216 1162 0


c  2-1 --> 1
c    (-b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧ -p_216) -> (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0)
c  in CNF:
c     b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_2
c     b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_1
c     b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨  b^{8, 28}_0
c  in DIMACS:
 10286 -10287  10288  216 -10289 0
 10286 -10287  10288  216 -10290 0
 10286 -10287  10288  216  10291 0

c  1-1 --> 0
c    (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0 ∧ -p_216) -> (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧ -b^{8, 28}_0)
c  in CNF:
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_2
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_1
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_0
c  in DIMACS:
 10286  10287 -10288  216 -10289 0
 10286  10287 -10288  216 -10290 0
 10286  10287 -10288  216 -10291 0

c  0-1 --> -1
c    (-b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧ -p_216) -> ( b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0)
c  in CNF:
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨  b^{8, 28}_2
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_1
c     b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨  b^{8, 28}_0
c  in DIMACS:
 10286  10287  10288  216  10289 0
 10286  10287  10288  216 -10290 0
 10286  10287  10288  216  10291 0

c  -1-1 --> -2
c    ( b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧  b^{8, 27}_0 ∧ -p_216) -> ( b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0)
c  in CNF:
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨  b^{8, 28}_2
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨  b^{8, 28}_1
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨  p_216 ∨ -b^{8, 28}_0
c  in DIMACS:
-10286  10287 -10288  216  10289 0
-10286  10287 -10288  216  10290 0
-10286  10287 -10288  216 -10291 0

c  -2-1 --> break 
c    ( b^{8, 27}_2 ∧  b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨  b^{8, 27}_0 ∨  p_216 ∨ break
c  in DIMACS:
-10286 -10287  10288  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 27}_2 ∧ -b^{8, 27}_1 ∧ -b^{8, 27}_0 ∧ true) 
c  in CNF:
c    -b^{8, 27}_2 ∨  b^{8, 27}_1 ∨  b^{8, 27}_0 ∨ false 
c  in DIMACS:
-10286  10287  10288  0

c  3 does not represent an automaton state.
c    -(-b^{8, 27}_2 ∧  b^{8, 27}_1 ∧  b^{8, 27}_0 ∧ true) 
c  in CNF:
c     b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ false 
c  in DIMACS:
 10286 -10287 -10288  0
c  -3 does not represent an automaton state.
c    -( b^{8, 27}_2 ∧  b^{8, 27}_1 ∧  b^{8, 27}_0 ∧ true) 
c  in CNF:
c    -b^{8, 27}_2 ∨ -b^{8, 27}_1 ∨ -b^{8, 27}_0 ∨ false 
c  in DIMACS:
-10286 -10287 -10288  0

c i = 28
c  -2+1 --> -1
c    ( b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧  p_224) -> ( b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0)
c  in CNF:
c    -b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨  b^{8, 29}_2
c    -b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_1
c    -b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨  b^{8, 29}_0
c  in DIMACS:
-10289 -10290  10291 -224  10292 0
-10289 -10290  10291 -224 -10293 0
-10289 -10290  10291 -224  10294 0

c  -1+1 --> 0
c    ( b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0 ∧  p_224) -> (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧ -b^{8, 29}_0)
c  in CNF:
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_2
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_1
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_0
c  in DIMACS:
-10289  10290 -10291 -224 -10292 0
-10289  10290 -10291 -224 -10293 0
-10289  10290 -10291 -224 -10294 0

c  0+1 --> 1
c    (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧  p_224) -> (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0)
c  in CNF:
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_2
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_1
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨  b^{8, 29}_0
c  in DIMACS:
 10289  10290  10291 -224 -10292 0
 10289  10290  10291 -224 -10293 0
 10289  10290  10291 -224  10294 0

c  1+1 --> 2
c    (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0 ∧  p_224) -> (-b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0)
c  in CNF:
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_2
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨  b^{8, 29}_1
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ -p_224 ∨ -b^{8, 29}_0
c  in DIMACS:
 10289  10290 -10291 -224 -10292 0
 10289  10290 -10291 -224  10293 0
 10289  10290 -10291 -224 -10294 0

c  2+1 --> break 
c    (-b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧  p_224) -> break
c  in CNF:
c     b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 10289 -10290  10291 -224 1162 0


c  2-1 --> 1
c    (-b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧ -p_224) -> (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0)
c  in CNF:
c     b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_2
c     b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_1
c     b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨  b^{8, 29}_0
c  in DIMACS:
 10289 -10290  10291  224 -10292 0
 10289 -10290  10291  224 -10293 0
 10289 -10290  10291  224  10294 0

c  1-1 --> 0
c    (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0 ∧ -p_224) -> (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧ -b^{8, 29}_0)
c  in CNF:
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_2
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_1
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_0
c  in DIMACS:
 10289  10290 -10291  224 -10292 0
 10289  10290 -10291  224 -10293 0
 10289  10290 -10291  224 -10294 0

c  0-1 --> -1
c    (-b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧ -p_224) -> ( b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0)
c  in CNF:
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨  b^{8, 29}_2
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_1
c     b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨  b^{8, 29}_0
c  in DIMACS:
 10289  10290  10291  224  10292 0
 10289  10290  10291  224 -10293 0
 10289  10290  10291  224  10294 0

c  -1-1 --> -2
c    ( b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧  b^{8, 28}_0 ∧ -p_224) -> ( b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0)
c  in CNF:
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨  b^{8, 29}_2
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨  b^{8, 29}_1
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨  p_224 ∨ -b^{8, 29}_0
c  in DIMACS:
-10289  10290 -10291  224  10292 0
-10289  10290 -10291  224  10293 0
-10289  10290 -10291  224 -10294 0

c  -2-1 --> break 
c    ( b^{8, 28}_2 ∧  b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨  b^{8, 28}_0 ∨  p_224 ∨ break
c  in DIMACS:
-10289 -10290  10291  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 28}_2 ∧ -b^{8, 28}_1 ∧ -b^{8, 28}_0 ∧ true) 
c  in CNF:
c    -b^{8, 28}_2 ∨  b^{8, 28}_1 ∨  b^{8, 28}_0 ∨ false 
c  in DIMACS:
-10289  10290  10291  0

c  3 does not represent an automaton state.
c    -(-b^{8, 28}_2 ∧  b^{8, 28}_1 ∧  b^{8, 28}_0 ∧ true) 
c  in CNF:
c     b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ false 
c  in DIMACS:
 10289 -10290 -10291  0
c  -3 does not represent an automaton state.
c    -( b^{8, 28}_2 ∧  b^{8, 28}_1 ∧  b^{8, 28}_0 ∧ true) 
c  in CNF:
c    -b^{8, 28}_2 ∨ -b^{8, 28}_1 ∨ -b^{8, 28}_0 ∨ false 
c  in DIMACS:
-10289 -10290 -10291  0

c i = 29
c  -2+1 --> -1
c    ( b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧  p_232) -> ( b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0)
c  in CNF:
c    -b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨  b^{8, 30}_2
c    -b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_1
c    -b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨  b^{8, 30}_0
c  in DIMACS:
-10292 -10293  10294 -232  10295 0
-10292 -10293  10294 -232 -10296 0
-10292 -10293  10294 -232  10297 0

c  -1+1 --> 0
c    ( b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0 ∧  p_232) -> (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧ -b^{8, 30}_0)
c  in CNF:
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_2
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_1
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_0
c  in DIMACS:
-10292  10293 -10294 -232 -10295 0
-10292  10293 -10294 -232 -10296 0
-10292  10293 -10294 -232 -10297 0

c  0+1 --> 1
c    (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧  p_232) -> (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0)
c  in CNF:
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_2
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_1
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨  b^{8, 30}_0
c  in DIMACS:
 10292  10293  10294 -232 -10295 0
 10292  10293  10294 -232 -10296 0
 10292  10293  10294 -232  10297 0

c  1+1 --> 2
c    (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0 ∧  p_232) -> (-b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0)
c  in CNF:
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_2
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨  b^{8, 30}_1
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ -p_232 ∨ -b^{8, 30}_0
c  in DIMACS:
 10292  10293 -10294 -232 -10295 0
 10292  10293 -10294 -232  10296 0
 10292  10293 -10294 -232 -10297 0

c  2+1 --> break 
c    (-b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧  p_232) -> break
c  in CNF:
c     b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 10292 -10293  10294 -232 1162 0


c  2-1 --> 1
c    (-b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧ -p_232) -> (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0)
c  in CNF:
c     b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_2
c     b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_1
c     b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨  b^{8, 30}_0
c  in DIMACS:
 10292 -10293  10294  232 -10295 0
 10292 -10293  10294  232 -10296 0
 10292 -10293  10294  232  10297 0

c  1-1 --> 0
c    (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0 ∧ -p_232) -> (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧ -b^{8, 30}_0)
c  in CNF:
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_2
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_1
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_0
c  in DIMACS:
 10292  10293 -10294  232 -10295 0
 10292  10293 -10294  232 -10296 0
 10292  10293 -10294  232 -10297 0

c  0-1 --> -1
c    (-b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧ -p_232) -> ( b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0)
c  in CNF:
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨  b^{8, 30}_2
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_1
c     b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨  b^{8, 30}_0
c  in DIMACS:
 10292  10293  10294  232  10295 0
 10292  10293  10294  232 -10296 0
 10292  10293  10294  232  10297 0

c  -1-1 --> -2
c    ( b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧  b^{8, 29}_0 ∧ -p_232) -> ( b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0)
c  in CNF:
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨  b^{8, 30}_2
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨  b^{8, 30}_1
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨  p_232 ∨ -b^{8, 30}_0
c  in DIMACS:
-10292  10293 -10294  232  10295 0
-10292  10293 -10294  232  10296 0
-10292  10293 -10294  232 -10297 0

c  -2-1 --> break 
c    ( b^{8, 29}_2 ∧  b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨  b^{8, 29}_0 ∨  p_232 ∨ break
c  in DIMACS:
-10292 -10293  10294  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 29}_2 ∧ -b^{8, 29}_1 ∧ -b^{8, 29}_0 ∧ true) 
c  in CNF:
c    -b^{8, 29}_2 ∨  b^{8, 29}_1 ∨  b^{8, 29}_0 ∨ false 
c  in DIMACS:
-10292  10293  10294  0

c  3 does not represent an automaton state.
c    -(-b^{8, 29}_2 ∧  b^{8, 29}_1 ∧  b^{8, 29}_0 ∧ true) 
c  in CNF:
c     b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ false 
c  in DIMACS:
 10292 -10293 -10294  0
c  -3 does not represent an automaton state.
c    -( b^{8, 29}_2 ∧  b^{8, 29}_1 ∧  b^{8, 29}_0 ∧ true) 
c  in CNF:
c    -b^{8, 29}_2 ∨ -b^{8, 29}_1 ∨ -b^{8, 29}_0 ∨ false 
c  in DIMACS:
-10292 -10293 -10294  0

c i = 30
c  -2+1 --> -1
c    ( b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧  p_240) -> ( b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0)
c  in CNF:
c    -b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨  b^{8, 31}_2
c    -b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_1
c    -b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨  b^{8, 31}_0
c  in DIMACS:
-10295 -10296  10297 -240  10298 0
-10295 -10296  10297 -240 -10299 0
-10295 -10296  10297 -240  10300 0

c  -1+1 --> 0
c    ( b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0 ∧  p_240) -> (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧ -b^{8, 31}_0)
c  in CNF:
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_2
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_1
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_0
c  in DIMACS:
-10295  10296 -10297 -240 -10298 0
-10295  10296 -10297 -240 -10299 0
-10295  10296 -10297 -240 -10300 0

c  0+1 --> 1
c    (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧  p_240) -> (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0)
c  in CNF:
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_2
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_1
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨  b^{8, 31}_0
c  in DIMACS:
 10295  10296  10297 -240 -10298 0
 10295  10296  10297 -240 -10299 0
 10295  10296  10297 -240  10300 0

c  1+1 --> 2
c    (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0 ∧  p_240) -> (-b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0)
c  in CNF:
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_2
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨  b^{8, 31}_1
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ -p_240 ∨ -b^{8, 31}_0
c  in DIMACS:
 10295  10296 -10297 -240 -10298 0
 10295  10296 -10297 -240  10299 0
 10295  10296 -10297 -240 -10300 0

c  2+1 --> break 
c    (-b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧  p_240) -> break
c  in CNF:
c     b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 10295 -10296  10297 -240 1162 0


c  2-1 --> 1
c    (-b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧ -p_240) -> (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0)
c  in CNF:
c     b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_2
c     b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_1
c     b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨  b^{8, 31}_0
c  in DIMACS:
 10295 -10296  10297  240 -10298 0
 10295 -10296  10297  240 -10299 0
 10295 -10296  10297  240  10300 0

c  1-1 --> 0
c    (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0 ∧ -p_240) -> (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧ -b^{8, 31}_0)
c  in CNF:
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_2
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_1
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_0
c  in DIMACS:
 10295  10296 -10297  240 -10298 0
 10295  10296 -10297  240 -10299 0
 10295  10296 -10297  240 -10300 0

c  0-1 --> -1
c    (-b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧ -p_240) -> ( b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0)
c  in CNF:
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨  b^{8, 31}_2
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_1
c     b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨  b^{8, 31}_0
c  in DIMACS:
 10295  10296  10297  240  10298 0
 10295  10296  10297  240 -10299 0
 10295  10296  10297  240  10300 0

c  -1-1 --> -2
c    ( b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧  b^{8, 30}_0 ∧ -p_240) -> ( b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0)
c  in CNF:
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨  b^{8, 31}_2
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨  b^{8, 31}_1
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨  p_240 ∨ -b^{8, 31}_0
c  in DIMACS:
-10295  10296 -10297  240  10298 0
-10295  10296 -10297  240  10299 0
-10295  10296 -10297  240 -10300 0

c  -2-1 --> break 
c    ( b^{8, 30}_2 ∧  b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨  b^{8, 30}_0 ∨  p_240 ∨ break
c  in DIMACS:
-10295 -10296  10297  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 30}_2 ∧ -b^{8, 30}_1 ∧ -b^{8, 30}_0 ∧ true) 
c  in CNF:
c    -b^{8, 30}_2 ∨  b^{8, 30}_1 ∨  b^{8, 30}_0 ∨ false 
c  in DIMACS:
-10295  10296  10297  0

c  3 does not represent an automaton state.
c    -(-b^{8, 30}_2 ∧  b^{8, 30}_1 ∧  b^{8, 30}_0 ∧ true) 
c  in CNF:
c     b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ false 
c  in DIMACS:
 10295 -10296 -10297  0
c  -3 does not represent an automaton state.
c    -( b^{8, 30}_2 ∧  b^{8, 30}_1 ∧  b^{8, 30}_0 ∧ true) 
c  in CNF:
c    -b^{8, 30}_2 ∨ -b^{8, 30}_1 ∨ -b^{8, 30}_0 ∨ false 
c  in DIMACS:
-10295 -10296 -10297  0

c i = 31
c  -2+1 --> -1
c    ( b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧  p_248) -> ( b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0)
c  in CNF:
c    -b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨  b^{8, 32}_2
c    -b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_1
c    -b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨  b^{8, 32}_0
c  in DIMACS:
-10298 -10299  10300 -248  10301 0
-10298 -10299  10300 -248 -10302 0
-10298 -10299  10300 -248  10303 0

c  -1+1 --> 0
c    ( b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0 ∧  p_248) -> (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧ -b^{8, 32}_0)
c  in CNF:
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_2
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_1
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_0
c  in DIMACS:
-10298  10299 -10300 -248 -10301 0
-10298  10299 -10300 -248 -10302 0
-10298  10299 -10300 -248 -10303 0

c  0+1 --> 1
c    (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧  p_248) -> (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0)
c  in CNF:
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_2
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_1
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨  b^{8, 32}_0
c  in DIMACS:
 10298  10299  10300 -248 -10301 0
 10298  10299  10300 -248 -10302 0
 10298  10299  10300 -248  10303 0

c  1+1 --> 2
c    (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0 ∧  p_248) -> (-b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0)
c  in CNF:
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_2
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨  b^{8, 32}_1
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ -p_248 ∨ -b^{8, 32}_0
c  in DIMACS:
 10298  10299 -10300 -248 -10301 0
 10298  10299 -10300 -248  10302 0
 10298  10299 -10300 -248 -10303 0

c  2+1 --> break 
c    (-b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧  p_248) -> break
c  in CNF:
c     b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 10298 -10299  10300 -248 1162 0


c  2-1 --> 1
c    (-b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧ -p_248) -> (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0)
c  in CNF:
c     b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_2
c     b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_1
c     b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨  b^{8, 32}_0
c  in DIMACS:
 10298 -10299  10300  248 -10301 0
 10298 -10299  10300  248 -10302 0
 10298 -10299  10300  248  10303 0

c  1-1 --> 0
c    (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0 ∧ -p_248) -> (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧ -b^{8, 32}_0)
c  in CNF:
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_2
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_1
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_0
c  in DIMACS:
 10298  10299 -10300  248 -10301 0
 10298  10299 -10300  248 -10302 0
 10298  10299 -10300  248 -10303 0

c  0-1 --> -1
c    (-b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧ -p_248) -> ( b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0)
c  in CNF:
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨  b^{8, 32}_2
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_1
c     b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨  b^{8, 32}_0
c  in DIMACS:
 10298  10299  10300  248  10301 0
 10298  10299  10300  248 -10302 0
 10298  10299  10300  248  10303 0

c  -1-1 --> -2
c    ( b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧  b^{8, 31}_0 ∧ -p_248) -> ( b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0)
c  in CNF:
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨  b^{8, 32}_2
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨  b^{8, 32}_1
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨  p_248 ∨ -b^{8, 32}_0
c  in DIMACS:
-10298  10299 -10300  248  10301 0
-10298  10299 -10300  248  10302 0
-10298  10299 -10300  248 -10303 0

c  -2-1 --> break 
c    ( b^{8, 31}_2 ∧  b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨  b^{8, 31}_0 ∨  p_248 ∨ break
c  in DIMACS:
-10298 -10299  10300  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 31}_2 ∧ -b^{8, 31}_1 ∧ -b^{8, 31}_0 ∧ true) 
c  in CNF:
c    -b^{8, 31}_2 ∨  b^{8, 31}_1 ∨  b^{8, 31}_0 ∨ false 
c  in DIMACS:
-10298  10299  10300  0

c  3 does not represent an automaton state.
c    -(-b^{8, 31}_2 ∧  b^{8, 31}_1 ∧  b^{8, 31}_0 ∧ true) 
c  in CNF:
c     b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ false 
c  in DIMACS:
 10298 -10299 -10300  0
c  -3 does not represent an automaton state.
c    -( b^{8, 31}_2 ∧  b^{8, 31}_1 ∧  b^{8, 31}_0 ∧ true) 
c  in CNF:
c    -b^{8, 31}_2 ∨ -b^{8, 31}_1 ∨ -b^{8, 31}_0 ∨ false 
c  in DIMACS:
-10298 -10299 -10300  0

c i = 32
c  -2+1 --> -1
c    ( b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧  p_256) -> ( b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0)
c  in CNF:
c    -b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨  b^{8, 33}_2
c    -b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_1
c    -b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨  b^{8, 33}_0
c  in DIMACS:
-10301 -10302  10303 -256  10304 0
-10301 -10302  10303 -256 -10305 0
-10301 -10302  10303 -256  10306 0

c  -1+1 --> 0
c    ( b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0 ∧  p_256) -> (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧ -b^{8, 33}_0)
c  in CNF:
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_2
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_1
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_0
c  in DIMACS:
-10301  10302 -10303 -256 -10304 0
-10301  10302 -10303 -256 -10305 0
-10301  10302 -10303 -256 -10306 0

c  0+1 --> 1
c    (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧  p_256) -> (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0)
c  in CNF:
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_2
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_1
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨  b^{8, 33}_0
c  in DIMACS:
 10301  10302  10303 -256 -10304 0
 10301  10302  10303 -256 -10305 0
 10301  10302  10303 -256  10306 0

c  1+1 --> 2
c    (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0 ∧  p_256) -> (-b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0)
c  in CNF:
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_2
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨  b^{8, 33}_1
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ -p_256 ∨ -b^{8, 33}_0
c  in DIMACS:
 10301  10302 -10303 -256 -10304 0
 10301  10302 -10303 -256  10305 0
 10301  10302 -10303 -256 -10306 0

c  2+1 --> break 
c    (-b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧  p_256) -> break
c  in CNF:
c     b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 10301 -10302  10303 -256 1162 0


c  2-1 --> 1
c    (-b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧ -p_256) -> (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0)
c  in CNF:
c     b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_2
c     b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_1
c     b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨  b^{8, 33}_0
c  in DIMACS:
 10301 -10302  10303  256 -10304 0
 10301 -10302  10303  256 -10305 0
 10301 -10302  10303  256  10306 0

c  1-1 --> 0
c    (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0 ∧ -p_256) -> (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧ -b^{8, 33}_0)
c  in CNF:
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_2
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_1
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_0
c  in DIMACS:
 10301  10302 -10303  256 -10304 0
 10301  10302 -10303  256 -10305 0
 10301  10302 -10303  256 -10306 0

c  0-1 --> -1
c    (-b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧ -p_256) -> ( b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0)
c  in CNF:
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨  b^{8, 33}_2
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_1
c     b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨  b^{8, 33}_0
c  in DIMACS:
 10301  10302  10303  256  10304 0
 10301  10302  10303  256 -10305 0
 10301  10302  10303  256  10306 0

c  -1-1 --> -2
c    ( b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧  b^{8, 32}_0 ∧ -p_256) -> ( b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0)
c  in CNF:
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨  b^{8, 33}_2
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨  b^{8, 33}_1
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨  p_256 ∨ -b^{8, 33}_0
c  in DIMACS:
-10301  10302 -10303  256  10304 0
-10301  10302 -10303  256  10305 0
-10301  10302 -10303  256 -10306 0

c  -2-1 --> break 
c    ( b^{8, 32}_2 ∧  b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨  b^{8, 32}_0 ∨  p_256 ∨ break
c  in DIMACS:
-10301 -10302  10303  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 32}_2 ∧ -b^{8, 32}_1 ∧ -b^{8, 32}_0 ∧ true) 
c  in CNF:
c    -b^{8, 32}_2 ∨  b^{8, 32}_1 ∨  b^{8, 32}_0 ∨ false 
c  in DIMACS:
-10301  10302  10303  0

c  3 does not represent an automaton state.
c    -(-b^{8, 32}_2 ∧  b^{8, 32}_1 ∧  b^{8, 32}_0 ∧ true) 
c  in CNF:
c     b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ false 
c  in DIMACS:
 10301 -10302 -10303  0
c  -3 does not represent an automaton state.
c    -( b^{8, 32}_2 ∧  b^{8, 32}_1 ∧  b^{8, 32}_0 ∧ true) 
c  in CNF:
c    -b^{8, 32}_2 ∨ -b^{8, 32}_1 ∨ -b^{8, 32}_0 ∨ false 
c  in DIMACS:
-10301 -10302 -10303  0

c i = 33
c  -2+1 --> -1
c    ( b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧  p_264) -> ( b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0)
c  in CNF:
c    -b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨  b^{8, 34}_2
c    -b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_1
c    -b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨  b^{8, 34}_0
c  in DIMACS:
-10304 -10305  10306 -264  10307 0
-10304 -10305  10306 -264 -10308 0
-10304 -10305  10306 -264  10309 0

c  -1+1 --> 0
c    ( b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0 ∧  p_264) -> (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧ -b^{8, 34}_0)
c  in CNF:
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_2
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_1
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_0
c  in DIMACS:
-10304  10305 -10306 -264 -10307 0
-10304  10305 -10306 -264 -10308 0
-10304  10305 -10306 -264 -10309 0

c  0+1 --> 1
c    (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧  p_264) -> (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0)
c  in CNF:
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_2
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_1
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨  b^{8, 34}_0
c  in DIMACS:
 10304  10305  10306 -264 -10307 0
 10304  10305  10306 -264 -10308 0
 10304  10305  10306 -264  10309 0

c  1+1 --> 2
c    (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0 ∧  p_264) -> (-b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0)
c  in CNF:
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_2
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨  b^{8, 34}_1
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ -p_264 ∨ -b^{8, 34}_0
c  in DIMACS:
 10304  10305 -10306 -264 -10307 0
 10304  10305 -10306 -264  10308 0
 10304  10305 -10306 -264 -10309 0

c  2+1 --> break 
c    (-b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧  p_264) -> break
c  in CNF:
c     b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 10304 -10305  10306 -264 1162 0


c  2-1 --> 1
c    (-b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧ -p_264) -> (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0)
c  in CNF:
c     b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_2
c     b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_1
c     b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨  b^{8, 34}_0
c  in DIMACS:
 10304 -10305  10306  264 -10307 0
 10304 -10305  10306  264 -10308 0
 10304 -10305  10306  264  10309 0

c  1-1 --> 0
c    (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0 ∧ -p_264) -> (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧ -b^{8, 34}_0)
c  in CNF:
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_2
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_1
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_0
c  in DIMACS:
 10304  10305 -10306  264 -10307 0
 10304  10305 -10306  264 -10308 0
 10304  10305 -10306  264 -10309 0

c  0-1 --> -1
c    (-b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧ -p_264) -> ( b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0)
c  in CNF:
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨  b^{8, 34}_2
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_1
c     b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨  b^{8, 34}_0
c  in DIMACS:
 10304  10305  10306  264  10307 0
 10304  10305  10306  264 -10308 0
 10304  10305  10306  264  10309 0

c  -1-1 --> -2
c    ( b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧  b^{8, 33}_0 ∧ -p_264) -> ( b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0)
c  in CNF:
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨  b^{8, 34}_2
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨  b^{8, 34}_1
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨  p_264 ∨ -b^{8, 34}_0
c  in DIMACS:
-10304  10305 -10306  264  10307 0
-10304  10305 -10306  264  10308 0
-10304  10305 -10306  264 -10309 0

c  -2-1 --> break 
c    ( b^{8, 33}_2 ∧  b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨  b^{8, 33}_0 ∨  p_264 ∨ break
c  in DIMACS:
-10304 -10305  10306  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 33}_2 ∧ -b^{8, 33}_1 ∧ -b^{8, 33}_0 ∧ true) 
c  in CNF:
c    -b^{8, 33}_2 ∨  b^{8, 33}_1 ∨  b^{8, 33}_0 ∨ false 
c  in DIMACS:
-10304  10305  10306  0

c  3 does not represent an automaton state.
c    -(-b^{8, 33}_2 ∧  b^{8, 33}_1 ∧  b^{8, 33}_0 ∧ true) 
c  in CNF:
c     b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ false 
c  in DIMACS:
 10304 -10305 -10306  0
c  -3 does not represent an automaton state.
c    -( b^{8, 33}_2 ∧  b^{8, 33}_1 ∧  b^{8, 33}_0 ∧ true) 
c  in CNF:
c    -b^{8, 33}_2 ∨ -b^{8, 33}_1 ∨ -b^{8, 33}_0 ∨ false 
c  in DIMACS:
-10304 -10305 -10306  0

c i = 34
c  -2+1 --> -1
c    ( b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧  p_272) -> ( b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0)
c  in CNF:
c    -b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨  b^{8, 35}_2
c    -b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_1
c    -b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨  b^{8, 35}_0
c  in DIMACS:
-10307 -10308  10309 -272  10310 0
-10307 -10308  10309 -272 -10311 0
-10307 -10308  10309 -272  10312 0

c  -1+1 --> 0
c    ( b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0 ∧  p_272) -> (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧ -b^{8, 35}_0)
c  in CNF:
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_2
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_1
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_0
c  in DIMACS:
-10307  10308 -10309 -272 -10310 0
-10307  10308 -10309 -272 -10311 0
-10307  10308 -10309 -272 -10312 0

c  0+1 --> 1
c    (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧  p_272) -> (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0)
c  in CNF:
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_2
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_1
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨  b^{8, 35}_0
c  in DIMACS:
 10307  10308  10309 -272 -10310 0
 10307  10308  10309 -272 -10311 0
 10307  10308  10309 -272  10312 0

c  1+1 --> 2
c    (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0 ∧  p_272) -> (-b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0)
c  in CNF:
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_2
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨  b^{8, 35}_1
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ -p_272 ∨ -b^{8, 35}_0
c  in DIMACS:
 10307  10308 -10309 -272 -10310 0
 10307  10308 -10309 -272  10311 0
 10307  10308 -10309 -272 -10312 0

c  2+1 --> break 
c    (-b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧  p_272) -> break
c  in CNF:
c     b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 10307 -10308  10309 -272 1162 0


c  2-1 --> 1
c    (-b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧ -p_272) -> (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0)
c  in CNF:
c     b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_2
c     b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_1
c     b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨  b^{8, 35}_0
c  in DIMACS:
 10307 -10308  10309  272 -10310 0
 10307 -10308  10309  272 -10311 0
 10307 -10308  10309  272  10312 0

c  1-1 --> 0
c    (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0 ∧ -p_272) -> (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧ -b^{8, 35}_0)
c  in CNF:
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_2
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_1
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_0
c  in DIMACS:
 10307  10308 -10309  272 -10310 0
 10307  10308 -10309  272 -10311 0
 10307  10308 -10309  272 -10312 0

c  0-1 --> -1
c    (-b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧ -p_272) -> ( b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0)
c  in CNF:
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨  b^{8, 35}_2
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_1
c     b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨  b^{8, 35}_0
c  in DIMACS:
 10307  10308  10309  272  10310 0
 10307  10308  10309  272 -10311 0
 10307  10308  10309  272  10312 0

c  -1-1 --> -2
c    ( b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧  b^{8, 34}_0 ∧ -p_272) -> ( b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0)
c  in CNF:
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨  b^{8, 35}_2
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨  b^{8, 35}_1
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨  p_272 ∨ -b^{8, 35}_0
c  in DIMACS:
-10307  10308 -10309  272  10310 0
-10307  10308 -10309  272  10311 0
-10307  10308 -10309  272 -10312 0

c  -2-1 --> break 
c    ( b^{8, 34}_2 ∧  b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨  b^{8, 34}_0 ∨  p_272 ∨ break
c  in DIMACS:
-10307 -10308  10309  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 34}_2 ∧ -b^{8, 34}_1 ∧ -b^{8, 34}_0 ∧ true) 
c  in CNF:
c    -b^{8, 34}_2 ∨  b^{8, 34}_1 ∨  b^{8, 34}_0 ∨ false 
c  in DIMACS:
-10307  10308  10309  0

c  3 does not represent an automaton state.
c    -(-b^{8, 34}_2 ∧  b^{8, 34}_1 ∧  b^{8, 34}_0 ∧ true) 
c  in CNF:
c     b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ false 
c  in DIMACS:
 10307 -10308 -10309  0
c  -3 does not represent an automaton state.
c    -( b^{8, 34}_2 ∧  b^{8, 34}_1 ∧  b^{8, 34}_0 ∧ true) 
c  in CNF:
c    -b^{8, 34}_2 ∨ -b^{8, 34}_1 ∨ -b^{8, 34}_0 ∨ false 
c  in DIMACS:
-10307 -10308 -10309  0

c i = 35
c  -2+1 --> -1
c    ( b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧  p_280) -> ( b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0)
c  in CNF:
c    -b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨  b^{8, 36}_2
c    -b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_1
c    -b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨  b^{8, 36}_0
c  in DIMACS:
-10310 -10311  10312 -280  10313 0
-10310 -10311  10312 -280 -10314 0
-10310 -10311  10312 -280  10315 0

c  -1+1 --> 0
c    ( b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0 ∧  p_280) -> (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧ -b^{8, 36}_0)
c  in CNF:
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_2
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_1
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_0
c  in DIMACS:
-10310  10311 -10312 -280 -10313 0
-10310  10311 -10312 -280 -10314 0
-10310  10311 -10312 -280 -10315 0

c  0+1 --> 1
c    (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧  p_280) -> (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0)
c  in CNF:
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_2
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_1
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨  b^{8, 36}_0
c  in DIMACS:
 10310  10311  10312 -280 -10313 0
 10310  10311  10312 -280 -10314 0
 10310  10311  10312 -280  10315 0

c  1+1 --> 2
c    (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0 ∧  p_280) -> (-b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0)
c  in CNF:
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_2
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨  b^{8, 36}_1
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ -p_280 ∨ -b^{8, 36}_0
c  in DIMACS:
 10310  10311 -10312 -280 -10313 0
 10310  10311 -10312 -280  10314 0
 10310  10311 -10312 -280 -10315 0

c  2+1 --> break 
c    (-b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧  p_280) -> break
c  in CNF:
c     b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 10310 -10311  10312 -280 1162 0


c  2-1 --> 1
c    (-b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧ -p_280) -> (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0)
c  in CNF:
c     b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_2
c     b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_1
c     b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨  b^{8, 36}_0
c  in DIMACS:
 10310 -10311  10312  280 -10313 0
 10310 -10311  10312  280 -10314 0
 10310 -10311  10312  280  10315 0

c  1-1 --> 0
c    (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0 ∧ -p_280) -> (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧ -b^{8, 36}_0)
c  in CNF:
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_2
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_1
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_0
c  in DIMACS:
 10310  10311 -10312  280 -10313 0
 10310  10311 -10312  280 -10314 0
 10310  10311 -10312  280 -10315 0

c  0-1 --> -1
c    (-b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧ -p_280) -> ( b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0)
c  in CNF:
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨  b^{8, 36}_2
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_1
c     b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨  b^{8, 36}_0
c  in DIMACS:
 10310  10311  10312  280  10313 0
 10310  10311  10312  280 -10314 0
 10310  10311  10312  280  10315 0

c  -1-1 --> -2
c    ( b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧  b^{8, 35}_0 ∧ -p_280) -> ( b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0)
c  in CNF:
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨  b^{8, 36}_2
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨  b^{8, 36}_1
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨  p_280 ∨ -b^{8, 36}_0
c  in DIMACS:
-10310  10311 -10312  280  10313 0
-10310  10311 -10312  280  10314 0
-10310  10311 -10312  280 -10315 0

c  -2-1 --> break 
c    ( b^{8, 35}_2 ∧  b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨  b^{8, 35}_0 ∨  p_280 ∨ break
c  in DIMACS:
-10310 -10311  10312  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 35}_2 ∧ -b^{8, 35}_1 ∧ -b^{8, 35}_0 ∧ true) 
c  in CNF:
c    -b^{8, 35}_2 ∨  b^{8, 35}_1 ∨  b^{8, 35}_0 ∨ false 
c  in DIMACS:
-10310  10311  10312  0

c  3 does not represent an automaton state.
c    -(-b^{8, 35}_2 ∧  b^{8, 35}_1 ∧  b^{8, 35}_0 ∧ true) 
c  in CNF:
c     b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ false 
c  in DIMACS:
 10310 -10311 -10312  0
c  -3 does not represent an automaton state.
c    -( b^{8, 35}_2 ∧  b^{8, 35}_1 ∧  b^{8, 35}_0 ∧ true) 
c  in CNF:
c    -b^{8, 35}_2 ∨ -b^{8, 35}_1 ∨ -b^{8, 35}_0 ∨ false 
c  in DIMACS:
-10310 -10311 -10312  0

c i = 36
c  -2+1 --> -1
c    ( b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧  p_288) -> ( b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0)
c  in CNF:
c    -b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨  b^{8, 37}_2
c    -b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_1
c    -b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨  b^{8, 37}_0
c  in DIMACS:
-10313 -10314  10315 -288  10316 0
-10313 -10314  10315 -288 -10317 0
-10313 -10314  10315 -288  10318 0

c  -1+1 --> 0
c    ( b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0 ∧  p_288) -> (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧ -b^{8, 37}_0)
c  in CNF:
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_2
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_1
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_0
c  in DIMACS:
-10313  10314 -10315 -288 -10316 0
-10313  10314 -10315 -288 -10317 0
-10313  10314 -10315 -288 -10318 0

c  0+1 --> 1
c    (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧  p_288) -> (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0)
c  in CNF:
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_2
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_1
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨  b^{8, 37}_0
c  in DIMACS:
 10313  10314  10315 -288 -10316 0
 10313  10314  10315 -288 -10317 0
 10313  10314  10315 -288  10318 0

c  1+1 --> 2
c    (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0 ∧  p_288) -> (-b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0)
c  in CNF:
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_2
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨  b^{8, 37}_1
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ -p_288 ∨ -b^{8, 37}_0
c  in DIMACS:
 10313  10314 -10315 -288 -10316 0
 10313  10314 -10315 -288  10317 0
 10313  10314 -10315 -288 -10318 0

c  2+1 --> break 
c    (-b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧  p_288) -> break
c  in CNF:
c     b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 10313 -10314  10315 -288 1162 0


c  2-1 --> 1
c    (-b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧ -p_288) -> (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0)
c  in CNF:
c     b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_2
c     b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_1
c     b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨  b^{8, 37}_0
c  in DIMACS:
 10313 -10314  10315  288 -10316 0
 10313 -10314  10315  288 -10317 0
 10313 -10314  10315  288  10318 0

c  1-1 --> 0
c    (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0 ∧ -p_288) -> (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧ -b^{8, 37}_0)
c  in CNF:
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_2
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_1
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_0
c  in DIMACS:
 10313  10314 -10315  288 -10316 0
 10313  10314 -10315  288 -10317 0
 10313  10314 -10315  288 -10318 0

c  0-1 --> -1
c    (-b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧ -p_288) -> ( b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0)
c  in CNF:
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨  b^{8, 37}_2
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_1
c     b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨  b^{8, 37}_0
c  in DIMACS:
 10313  10314  10315  288  10316 0
 10313  10314  10315  288 -10317 0
 10313  10314  10315  288  10318 0

c  -1-1 --> -2
c    ( b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧  b^{8, 36}_0 ∧ -p_288) -> ( b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0)
c  in CNF:
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨  b^{8, 37}_2
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨  b^{8, 37}_1
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨  p_288 ∨ -b^{8, 37}_0
c  in DIMACS:
-10313  10314 -10315  288  10316 0
-10313  10314 -10315  288  10317 0
-10313  10314 -10315  288 -10318 0

c  -2-1 --> break 
c    ( b^{8, 36}_2 ∧  b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨  b^{8, 36}_0 ∨  p_288 ∨ break
c  in DIMACS:
-10313 -10314  10315  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 36}_2 ∧ -b^{8, 36}_1 ∧ -b^{8, 36}_0 ∧ true) 
c  in CNF:
c    -b^{8, 36}_2 ∨  b^{8, 36}_1 ∨  b^{8, 36}_0 ∨ false 
c  in DIMACS:
-10313  10314  10315  0

c  3 does not represent an automaton state.
c    -(-b^{8, 36}_2 ∧  b^{8, 36}_1 ∧  b^{8, 36}_0 ∧ true) 
c  in CNF:
c     b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ false 
c  in DIMACS:
 10313 -10314 -10315  0
c  -3 does not represent an automaton state.
c    -( b^{8, 36}_2 ∧  b^{8, 36}_1 ∧  b^{8, 36}_0 ∧ true) 
c  in CNF:
c    -b^{8, 36}_2 ∨ -b^{8, 36}_1 ∨ -b^{8, 36}_0 ∨ false 
c  in DIMACS:
-10313 -10314 -10315  0

c i = 37
c  -2+1 --> -1
c    ( b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧  p_296) -> ( b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0)
c  in CNF:
c    -b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨  b^{8, 38}_2
c    -b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_1
c    -b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨  b^{8, 38}_0
c  in DIMACS:
-10316 -10317  10318 -296  10319 0
-10316 -10317  10318 -296 -10320 0
-10316 -10317  10318 -296  10321 0

c  -1+1 --> 0
c    ( b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0 ∧  p_296) -> (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧ -b^{8, 38}_0)
c  in CNF:
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_2
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_1
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_0
c  in DIMACS:
-10316  10317 -10318 -296 -10319 0
-10316  10317 -10318 -296 -10320 0
-10316  10317 -10318 -296 -10321 0

c  0+1 --> 1
c    (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧  p_296) -> (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0)
c  in CNF:
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_2
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_1
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨  b^{8, 38}_0
c  in DIMACS:
 10316  10317  10318 -296 -10319 0
 10316  10317  10318 -296 -10320 0
 10316  10317  10318 -296  10321 0

c  1+1 --> 2
c    (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0 ∧  p_296) -> (-b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0)
c  in CNF:
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_2
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨  b^{8, 38}_1
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ -p_296 ∨ -b^{8, 38}_0
c  in DIMACS:
 10316  10317 -10318 -296 -10319 0
 10316  10317 -10318 -296  10320 0
 10316  10317 -10318 -296 -10321 0

c  2+1 --> break 
c    (-b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧  p_296) -> break
c  in CNF:
c     b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 10316 -10317  10318 -296 1162 0


c  2-1 --> 1
c    (-b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧ -p_296) -> (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0)
c  in CNF:
c     b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_2
c     b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_1
c     b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨  b^{8, 38}_0
c  in DIMACS:
 10316 -10317  10318  296 -10319 0
 10316 -10317  10318  296 -10320 0
 10316 -10317  10318  296  10321 0

c  1-1 --> 0
c    (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0 ∧ -p_296) -> (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧ -b^{8, 38}_0)
c  in CNF:
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_2
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_1
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_0
c  in DIMACS:
 10316  10317 -10318  296 -10319 0
 10316  10317 -10318  296 -10320 0
 10316  10317 -10318  296 -10321 0

c  0-1 --> -1
c    (-b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧ -p_296) -> ( b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0)
c  in CNF:
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨  b^{8, 38}_2
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_1
c     b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨  b^{8, 38}_0
c  in DIMACS:
 10316  10317  10318  296  10319 0
 10316  10317  10318  296 -10320 0
 10316  10317  10318  296  10321 0

c  -1-1 --> -2
c    ( b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧  b^{8, 37}_0 ∧ -p_296) -> ( b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0)
c  in CNF:
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨  b^{8, 38}_2
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨  b^{8, 38}_1
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨  p_296 ∨ -b^{8, 38}_0
c  in DIMACS:
-10316  10317 -10318  296  10319 0
-10316  10317 -10318  296  10320 0
-10316  10317 -10318  296 -10321 0

c  -2-1 --> break 
c    ( b^{8, 37}_2 ∧  b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨  b^{8, 37}_0 ∨  p_296 ∨ break
c  in DIMACS:
-10316 -10317  10318  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 37}_2 ∧ -b^{8, 37}_1 ∧ -b^{8, 37}_0 ∧ true) 
c  in CNF:
c    -b^{8, 37}_2 ∨  b^{8, 37}_1 ∨  b^{8, 37}_0 ∨ false 
c  in DIMACS:
-10316  10317  10318  0

c  3 does not represent an automaton state.
c    -(-b^{8, 37}_2 ∧  b^{8, 37}_1 ∧  b^{8, 37}_0 ∧ true) 
c  in CNF:
c     b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ false 
c  in DIMACS:
 10316 -10317 -10318  0
c  -3 does not represent an automaton state.
c    -( b^{8, 37}_2 ∧  b^{8, 37}_1 ∧  b^{8, 37}_0 ∧ true) 
c  in CNF:
c    -b^{8, 37}_2 ∨ -b^{8, 37}_1 ∨ -b^{8, 37}_0 ∨ false 
c  in DIMACS:
-10316 -10317 -10318  0

c i = 38
c  -2+1 --> -1
c    ( b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧  p_304) -> ( b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0)
c  in CNF:
c    -b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨  b^{8, 39}_2
c    -b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_1
c    -b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨  b^{8, 39}_0
c  in DIMACS:
-10319 -10320  10321 -304  10322 0
-10319 -10320  10321 -304 -10323 0
-10319 -10320  10321 -304  10324 0

c  -1+1 --> 0
c    ( b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0 ∧  p_304) -> (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧ -b^{8, 39}_0)
c  in CNF:
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_2
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_1
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_0
c  in DIMACS:
-10319  10320 -10321 -304 -10322 0
-10319  10320 -10321 -304 -10323 0
-10319  10320 -10321 -304 -10324 0

c  0+1 --> 1
c    (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧  p_304) -> (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0)
c  in CNF:
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_2
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_1
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨  b^{8, 39}_0
c  in DIMACS:
 10319  10320  10321 -304 -10322 0
 10319  10320  10321 -304 -10323 0
 10319  10320  10321 -304  10324 0

c  1+1 --> 2
c    (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0 ∧  p_304) -> (-b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0)
c  in CNF:
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_2
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨  b^{8, 39}_1
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ -p_304 ∨ -b^{8, 39}_0
c  in DIMACS:
 10319  10320 -10321 -304 -10322 0
 10319  10320 -10321 -304  10323 0
 10319  10320 -10321 -304 -10324 0

c  2+1 --> break 
c    (-b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧  p_304) -> break
c  in CNF:
c     b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 10319 -10320  10321 -304 1162 0


c  2-1 --> 1
c    (-b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧ -p_304) -> (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0)
c  in CNF:
c     b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_2
c     b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_1
c     b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨  b^{8, 39}_0
c  in DIMACS:
 10319 -10320  10321  304 -10322 0
 10319 -10320  10321  304 -10323 0
 10319 -10320  10321  304  10324 0

c  1-1 --> 0
c    (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0 ∧ -p_304) -> (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧ -b^{8, 39}_0)
c  in CNF:
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_2
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_1
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_0
c  in DIMACS:
 10319  10320 -10321  304 -10322 0
 10319  10320 -10321  304 -10323 0
 10319  10320 -10321  304 -10324 0

c  0-1 --> -1
c    (-b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧ -p_304) -> ( b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0)
c  in CNF:
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨  b^{8, 39}_2
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_1
c     b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨  b^{8, 39}_0
c  in DIMACS:
 10319  10320  10321  304  10322 0
 10319  10320  10321  304 -10323 0
 10319  10320  10321  304  10324 0

c  -1-1 --> -2
c    ( b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧  b^{8, 38}_0 ∧ -p_304) -> ( b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0)
c  in CNF:
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨  b^{8, 39}_2
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨  b^{8, 39}_1
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨  p_304 ∨ -b^{8, 39}_0
c  in DIMACS:
-10319  10320 -10321  304  10322 0
-10319  10320 -10321  304  10323 0
-10319  10320 -10321  304 -10324 0

c  -2-1 --> break 
c    ( b^{8, 38}_2 ∧  b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨  b^{8, 38}_0 ∨  p_304 ∨ break
c  in DIMACS:
-10319 -10320  10321  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 38}_2 ∧ -b^{8, 38}_1 ∧ -b^{8, 38}_0 ∧ true) 
c  in CNF:
c    -b^{8, 38}_2 ∨  b^{8, 38}_1 ∨  b^{8, 38}_0 ∨ false 
c  in DIMACS:
-10319  10320  10321  0

c  3 does not represent an automaton state.
c    -(-b^{8, 38}_2 ∧  b^{8, 38}_1 ∧  b^{8, 38}_0 ∧ true) 
c  in CNF:
c     b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ false 
c  in DIMACS:
 10319 -10320 -10321  0
c  -3 does not represent an automaton state.
c    -( b^{8, 38}_2 ∧  b^{8, 38}_1 ∧  b^{8, 38}_0 ∧ true) 
c  in CNF:
c    -b^{8, 38}_2 ∨ -b^{8, 38}_1 ∨ -b^{8, 38}_0 ∨ false 
c  in DIMACS:
-10319 -10320 -10321  0

c i = 39
c  -2+1 --> -1
c    ( b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧  p_312) -> ( b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0)
c  in CNF:
c    -b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨  b^{8, 40}_2
c    -b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_1
c    -b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨  b^{8, 40}_0
c  in DIMACS:
-10322 -10323  10324 -312  10325 0
-10322 -10323  10324 -312 -10326 0
-10322 -10323  10324 -312  10327 0

c  -1+1 --> 0
c    ( b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0 ∧  p_312) -> (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧ -b^{8, 40}_0)
c  in CNF:
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_2
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_1
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_0
c  in DIMACS:
-10322  10323 -10324 -312 -10325 0
-10322  10323 -10324 -312 -10326 0
-10322  10323 -10324 -312 -10327 0

c  0+1 --> 1
c    (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧  p_312) -> (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0)
c  in CNF:
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_2
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_1
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨  b^{8, 40}_0
c  in DIMACS:
 10322  10323  10324 -312 -10325 0
 10322  10323  10324 -312 -10326 0
 10322  10323  10324 -312  10327 0

c  1+1 --> 2
c    (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0 ∧  p_312) -> (-b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0)
c  in CNF:
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_2
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨  b^{8, 40}_1
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ -p_312 ∨ -b^{8, 40}_0
c  in DIMACS:
 10322  10323 -10324 -312 -10325 0
 10322  10323 -10324 -312  10326 0
 10322  10323 -10324 -312 -10327 0

c  2+1 --> break 
c    (-b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧  p_312) -> break
c  in CNF:
c     b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 10322 -10323  10324 -312 1162 0


c  2-1 --> 1
c    (-b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧ -p_312) -> (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0)
c  in CNF:
c     b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_2
c     b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_1
c     b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨  b^{8, 40}_0
c  in DIMACS:
 10322 -10323  10324  312 -10325 0
 10322 -10323  10324  312 -10326 0
 10322 -10323  10324  312  10327 0

c  1-1 --> 0
c    (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0 ∧ -p_312) -> (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧ -b^{8, 40}_0)
c  in CNF:
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_2
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_1
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_0
c  in DIMACS:
 10322  10323 -10324  312 -10325 0
 10322  10323 -10324  312 -10326 0
 10322  10323 -10324  312 -10327 0

c  0-1 --> -1
c    (-b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧ -p_312) -> ( b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0)
c  in CNF:
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨  b^{8, 40}_2
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_1
c     b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨  b^{8, 40}_0
c  in DIMACS:
 10322  10323  10324  312  10325 0
 10322  10323  10324  312 -10326 0
 10322  10323  10324  312  10327 0

c  -1-1 --> -2
c    ( b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧  b^{8, 39}_0 ∧ -p_312) -> ( b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0)
c  in CNF:
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨  b^{8, 40}_2
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨  b^{8, 40}_1
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨  p_312 ∨ -b^{8, 40}_0
c  in DIMACS:
-10322  10323 -10324  312  10325 0
-10322  10323 -10324  312  10326 0
-10322  10323 -10324  312 -10327 0

c  -2-1 --> break 
c    ( b^{8, 39}_2 ∧  b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨  b^{8, 39}_0 ∨  p_312 ∨ break
c  in DIMACS:
-10322 -10323  10324  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 39}_2 ∧ -b^{8, 39}_1 ∧ -b^{8, 39}_0 ∧ true) 
c  in CNF:
c    -b^{8, 39}_2 ∨  b^{8, 39}_1 ∨  b^{8, 39}_0 ∨ false 
c  in DIMACS:
-10322  10323  10324  0

c  3 does not represent an automaton state.
c    -(-b^{8, 39}_2 ∧  b^{8, 39}_1 ∧  b^{8, 39}_0 ∧ true) 
c  in CNF:
c     b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ false 
c  in DIMACS:
 10322 -10323 -10324  0
c  -3 does not represent an automaton state.
c    -( b^{8, 39}_2 ∧  b^{8, 39}_1 ∧  b^{8, 39}_0 ∧ true) 
c  in CNF:
c    -b^{8, 39}_2 ∨ -b^{8, 39}_1 ∨ -b^{8, 39}_0 ∨ false 
c  in DIMACS:
-10322 -10323 -10324  0

c i = 40
c  -2+1 --> -1
c    ( b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧  p_320) -> ( b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0)
c  in CNF:
c    -b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨  b^{8, 41}_2
c    -b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_1
c    -b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨  b^{8, 41}_0
c  in DIMACS:
-10325 -10326  10327 -320  10328 0
-10325 -10326  10327 -320 -10329 0
-10325 -10326  10327 -320  10330 0

c  -1+1 --> 0
c    ( b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0 ∧  p_320) -> (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧ -b^{8, 41}_0)
c  in CNF:
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_2
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_1
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_0
c  in DIMACS:
-10325  10326 -10327 -320 -10328 0
-10325  10326 -10327 -320 -10329 0
-10325  10326 -10327 -320 -10330 0

c  0+1 --> 1
c    (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧  p_320) -> (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0)
c  in CNF:
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_2
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_1
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨  b^{8, 41}_0
c  in DIMACS:
 10325  10326  10327 -320 -10328 0
 10325  10326  10327 -320 -10329 0
 10325  10326  10327 -320  10330 0

c  1+1 --> 2
c    (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0 ∧  p_320) -> (-b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0)
c  in CNF:
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_2
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨  b^{8, 41}_1
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ -p_320 ∨ -b^{8, 41}_0
c  in DIMACS:
 10325  10326 -10327 -320 -10328 0
 10325  10326 -10327 -320  10329 0
 10325  10326 -10327 -320 -10330 0

c  2+1 --> break 
c    (-b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧  p_320) -> break
c  in CNF:
c     b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 10325 -10326  10327 -320 1162 0


c  2-1 --> 1
c    (-b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧ -p_320) -> (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0)
c  in CNF:
c     b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_2
c     b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_1
c     b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨  b^{8, 41}_0
c  in DIMACS:
 10325 -10326  10327  320 -10328 0
 10325 -10326  10327  320 -10329 0
 10325 -10326  10327  320  10330 0

c  1-1 --> 0
c    (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0 ∧ -p_320) -> (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧ -b^{8, 41}_0)
c  in CNF:
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_2
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_1
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_0
c  in DIMACS:
 10325  10326 -10327  320 -10328 0
 10325  10326 -10327  320 -10329 0
 10325  10326 -10327  320 -10330 0

c  0-1 --> -1
c    (-b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧ -p_320) -> ( b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0)
c  in CNF:
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨  b^{8, 41}_2
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_1
c     b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨  b^{8, 41}_0
c  in DIMACS:
 10325  10326  10327  320  10328 0
 10325  10326  10327  320 -10329 0
 10325  10326  10327  320  10330 0

c  -1-1 --> -2
c    ( b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧  b^{8, 40}_0 ∧ -p_320) -> ( b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0)
c  in CNF:
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨  b^{8, 41}_2
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨  b^{8, 41}_1
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨  p_320 ∨ -b^{8, 41}_0
c  in DIMACS:
-10325  10326 -10327  320  10328 0
-10325  10326 -10327  320  10329 0
-10325  10326 -10327  320 -10330 0

c  -2-1 --> break 
c    ( b^{8, 40}_2 ∧  b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨  b^{8, 40}_0 ∨  p_320 ∨ break
c  in DIMACS:
-10325 -10326  10327  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 40}_2 ∧ -b^{8, 40}_1 ∧ -b^{8, 40}_0 ∧ true) 
c  in CNF:
c    -b^{8, 40}_2 ∨  b^{8, 40}_1 ∨  b^{8, 40}_0 ∨ false 
c  in DIMACS:
-10325  10326  10327  0

c  3 does not represent an automaton state.
c    -(-b^{8, 40}_2 ∧  b^{8, 40}_1 ∧  b^{8, 40}_0 ∧ true) 
c  in CNF:
c     b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ false 
c  in DIMACS:
 10325 -10326 -10327  0
c  -3 does not represent an automaton state.
c    -( b^{8, 40}_2 ∧  b^{8, 40}_1 ∧  b^{8, 40}_0 ∧ true) 
c  in CNF:
c    -b^{8, 40}_2 ∨ -b^{8, 40}_1 ∨ -b^{8, 40}_0 ∨ false 
c  in DIMACS:
-10325 -10326 -10327  0

c i = 41
c  -2+1 --> -1
c    ( b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧  p_328) -> ( b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0)
c  in CNF:
c    -b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨  b^{8, 42}_2
c    -b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_1
c    -b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨  b^{8, 42}_0
c  in DIMACS:
-10328 -10329  10330 -328  10331 0
-10328 -10329  10330 -328 -10332 0
-10328 -10329  10330 -328  10333 0

c  -1+1 --> 0
c    ( b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0 ∧  p_328) -> (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧ -b^{8, 42}_0)
c  in CNF:
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_2
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_1
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_0
c  in DIMACS:
-10328  10329 -10330 -328 -10331 0
-10328  10329 -10330 -328 -10332 0
-10328  10329 -10330 -328 -10333 0

c  0+1 --> 1
c    (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧  p_328) -> (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0)
c  in CNF:
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_2
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_1
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨  b^{8, 42}_0
c  in DIMACS:
 10328  10329  10330 -328 -10331 0
 10328  10329  10330 -328 -10332 0
 10328  10329  10330 -328  10333 0

c  1+1 --> 2
c    (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0 ∧  p_328) -> (-b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0)
c  in CNF:
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_2
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨  b^{8, 42}_1
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ -p_328 ∨ -b^{8, 42}_0
c  in DIMACS:
 10328  10329 -10330 -328 -10331 0
 10328  10329 -10330 -328  10332 0
 10328  10329 -10330 -328 -10333 0

c  2+1 --> break 
c    (-b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧  p_328) -> break
c  in CNF:
c     b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 10328 -10329  10330 -328 1162 0


c  2-1 --> 1
c    (-b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧ -p_328) -> (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0)
c  in CNF:
c     b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_2
c     b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_1
c     b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨  b^{8, 42}_0
c  in DIMACS:
 10328 -10329  10330  328 -10331 0
 10328 -10329  10330  328 -10332 0
 10328 -10329  10330  328  10333 0

c  1-1 --> 0
c    (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0 ∧ -p_328) -> (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧ -b^{8, 42}_0)
c  in CNF:
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_2
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_1
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_0
c  in DIMACS:
 10328  10329 -10330  328 -10331 0
 10328  10329 -10330  328 -10332 0
 10328  10329 -10330  328 -10333 0

c  0-1 --> -1
c    (-b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧ -p_328) -> ( b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0)
c  in CNF:
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨  b^{8, 42}_2
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_1
c     b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨  b^{8, 42}_0
c  in DIMACS:
 10328  10329  10330  328  10331 0
 10328  10329  10330  328 -10332 0
 10328  10329  10330  328  10333 0

c  -1-1 --> -2
c    ( b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧  b^{8, 41}_0 ∧ -p_328) -> ( b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0)
c  in CNF:
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨  b^{8, 42}_2
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨  b^{8, 42}_1
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨  p_328 ∨ -b^{8, 42}_0
c  in DIMACS:
-10328  10329 -10330  328  10331 0
-10328  10329 -10330  328  10332 0
-10328  10329 -10330  328 -10333 0

c  -2-1 --> break 
c    ( b^{8, 41}_2 ∧  b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨  b^{8, 41}_0 ∨  p_328 ∨ break
c  in DIMACS:
-10328 -10329  10330  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 41}_2 ∧ -b^{8, 41}_1 ∧ -b^{8, 41}_0 ∧ true) 
c  in CNF:
c    -b^{8, 41}_2 ∨  b^{8, 41}_1 ∨  b^{8, 41}_0 ∨ false 
c  in DIMACS:
-10328  10329  10330  0

c  3 does not represent an automaton state.
c    -(-b^{8, 41}_2 ∧  b^{8, 41}_1 ∧  b^{8, 41}_0 ∧ true) 
c  in CNF:
c     b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ false 
c  in DIMACS:
 10328 -10329 -10330  0
c  -3 does not represent an automaton state.
c    -( b^{8, 41}_2 ∧  b^{8, 41}_1 ∧  b^{8, 41}_0 ∧ true) 
c  in CNF:
c    -b^{8, 41}_2 ∨ -b^{8, 41}_1 ∨ -b^{8, 41}_0 ∨ false 
c  in DIMACS:
-10328 -10329 -10330  0

c i = 42
c  -2+1 --> -1
c    ( b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧  p_336) -> ( b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0)
c  in CNF:
c    -b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨  b^{8, 43}_2
c    -b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_1
c    -b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨  b^{8, 43}_0
c  in DIMACS:
-10331 -10332  10333 -336  10334 0
-10331 -10332  10333 -336 -10335 0
-10331 -10332  10333 -336  10336 0

c  -1+1 --> 0
c    ( b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0 ∧  p_336) -> (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧ -b^{8, 43}_0)
c  in CNF:
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_2
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_1
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_0
c  in DIMACS:
-10331  10332 -10333 -336 -10334 0
-10331  10332 -10333 -336 -10335 0
-10331  10332 -10333 -336 -10336 0

c  0+1 --> 1
c    (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧  p_336) -> (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0)
c  in CNF:
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_2
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_1
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨  b^{8, 43}_0
c  in DIMACS:
 10331  10332  10333 -336 -10334 0
 10331  10332  10333 -336 -10335 0
 10331  10332  10333 -336  10336 0

c  1+1 --> 2
c    (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0 ∧  p_336) -> (-b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0)
c  in CNF:
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_2
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨  b^{8, 43}_1
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ -p_336 ∨ -b^{8, 43}_0
c  in DIMACS:
 10331  10332 -10333 -336 -10334 0
 10331  10332 -10333 -336  10335 0
 10331  10332 -10333 -336 -10336 0

c  2+1 --> break 
c    (-b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧  p_336) -> break
c  in CNF:
c     b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 10331 -10332  10333 -336 1162 0


c  2-1 --> 1
c    (-b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧ -p_336) -> (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0)
c  in CNF:
c     b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_2
c     b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_1
c     b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨  b^{8, 43}_0
c  in DIMACS:
 10331 -10332  10333  336 -10334 0
 10331 -10332  10333  336 -10335 0
 10331 -10332  10333  336  10336 0

c  1-1 --> 0
c    (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0 ∧ -p_336) -> (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧ -b^{8, 43}_0)
c  in CNF:
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_2
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_1
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_0
c  in DIMACS:
 10331  10332 -10333  336 -10334 0
 10331  10332 -10333  336 -10335 0
 10331  10332 -10333  336 -10336 0

c  0-1 --> -1
c    (-b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧ -p_336) -> ( b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0)
c  in CNF:
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨  b^{8, 43}_2
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_1
c     b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨  b^{8, 43}_0
c  in DIMACS:
 10331  10332  10333  336  10334 0
 10331  10332  10333  336 -10335 0
 10331  10332  10333  336  10336 0

c  -1-1 --> -2
c    ( b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧  b^{8, 42}_0 ∧ -p_336) -> ( b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0)
c  in CNF:
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨  b^{8, 43}_2
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨  b^{8, 43}_1
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨  p_336 ∨ -b^{8, 43}_0
c  in DIMACS:
-10331  10332 -10333  336  10334 0
-10331  10332 -10333  336  10335 0
-10331  10332 -10333  336 -10336 0

c  -2-1 --> break 
c    ( b^{8, 42}_2 ∧  b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨  b^{8, 42}_0 ∨  p_336 ∨ break
c  in DIMACS:
-10331 -10332  10333  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 42}_2 ∧ -b^{8, 42}_1 ∧ -b^{8, 42}_0 ∧ true) 
c  in CNF:
c    -b^{8, 42}_2 ∨  b^{8, 42}_1 ∨  b^{8, 42}_0 ∨ false 
c  in DIMACS:
-10331  10332  10333  0

c  3 does not represent an automaton state.
c    -(-b^{8, 42}_2 ∧  b^{8, 42}_1 ∧  b^{8, 42}_0 ∧ true) 
c  in CNF:
c     b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ false 
c  in DIMACS:
 10331 -10332 -10333  0
c  -3 does not represent an automaton state.
c    -( b^{8, 42}_2 ∧  b^{8, 42}_1 ∧  b^{8, 42}_0 ∧ true) 
c  in CNF:
c    -b^{8, 42}_2 ∨ -b^{8, 42}_1 ∨ -b^{8, 42}_0 ∨ false 
c  in DIMACS:
-10331 -10332 -10333  0

c i = 43
c  -2+1 --> -1
c    ( b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧  p_344) -> ( b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0)
c  in CNF:
c    -b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨  b^{8, 44}_2
c    -b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_1
c    -b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨  b^{8, 44}_0
c  in DIMACS:
-10334 -10335  10336 -344  10337 0
-10334 -10335  10336 -344 -10338 0
-10334 -10335  10336 -344  10339 0

c  -1+1 --> 0
c    ( b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0 ∧  p_344) -> (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧ -b^{8, 44}_0)
c  in CNF:
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_2
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_1
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_0
c  in DIMACS:
-10334  10335 -10336 -344 -10337 0
-10334  10335 -10336 -344 -10338 0
-10334  10335 -10336 -344 -10339 0

c  0+1 --> 1
c    (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧  p_344) -> (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0)
c  in CNF:
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_2
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_1
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨  b^{8, 44}_0
c  in DIMACS:
 10334  10335  10336 -344 -10337 0
 10334  10335  10336 -344 -10338 0
 10334  10335  10336 -344  10339 0

c  1+1 --> 2
c    (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0 ∧  p_344) -> (-b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0)
c  in CNF:
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_2
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨  b^{8, 44}_1
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ -p_344 ∨ -b^{8, 44}_0
c  in DIMACS:
 10334  10335 -10336 -344 -10337 0
 10334  10335 -10336 -344  10338 0
 10334  10335 -10336 -344 -10339 0

c  2+1 --> break 
c    (-b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧  p_344) -> break
c  in CNF:
c     b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 10334 -10335  10336 -344 1162 0


c  2-1 --> 1
c    (-b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧ -p_344) -> (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0)
c  in CNF:
c     b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_2
c     b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_1
c     b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨  b^{8, 44}_0
c  in DIMACS:
 10334 -10335  10336  344 -10337 0
 10334 -10335  10336  344 -10338 0
 10334 -10335  10336  344  10339 0

c  1-1 --> 0
c    (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0 ∧ -p_344) -> (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧ -b^{8, 44}_0)
c  in CNF:
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_2
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_1
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_0
c  in DIMACS:
 10334  10335 -10336  344 -10337 0
 10334  10335 -10336  344 -10338 0
 10334  10335 -10336  344 -10339 0

c  0-1 --> -1
c    (-b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧ -p_344) -> ( b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0)
c  in CNF:
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨  b^{8, 44}_2
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_1
c     b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨  b^{8, 44}_0
c  in DIMACS:
 10334  10335  10336  344  10337 0
 10334  10335  10336  344 -10338 0
 10334  10335  10336  344  10339 0

c  -1-1 --> -2
c    ( b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧  b^{8, 43}_0 ∧ -p_344) -> ( b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0)
c  in CNF:
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨  b^{8, 44}_2
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨  b^{8, 44}_1
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨  p_344 ∨ -b^{8, 44}_0
c  in DIMACS:
-10334  10335 -10336  344  10337 0
-10334  10335 -10336  344  10338 0
-10334  10335 -10336  344 -10339 0

c  -2-1 --> break 
c    ( b^{8, 43}_2 ∧  b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨  b^{8, 43}_0 ∨  p_344 ∨ break
c  in DIMACS:
-10334 -10335  10336  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 43}_2 ∧ -b^{8, 43}_1 ∧ -b^{8, 43}_0 ∧ true) 
c  in CNF:
c    -b^{8, 43}_2 ∨  b^{8, 43}_1 ∨  b^{8, 43}_0 ∨ false 
c  in DIMACS:
-10334  10335  10336  0

c  3 does not represent an automaton state.
c    -(-b^{8, 43}_2 ∧  b^{8, 43}_1 ∧  b^{8, 43}_0 ∧ true) 
c  in CNF:
c     b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ false 
c  in DIMACS:
 10334 -10335 -10336  0
c  -3 does not represent an automaton state.
c    -( b^{8, 43}_2 ∧  b^{8, 43}_1 ∧  b^{8, 43}_0 ∧ true) 
c  in CNF:
c    -b^{8, 43}_2 ∨ -b^{8, 43}_1 ∨ -b^{8, 43}_0 ∨ false 
c  in DIMACS:
-10334 -10335 -10336  0

c i = 44
c  -2+1 --> -1
c    ( b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧  p_352) -> ( b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0)
c  in CNF:
c    -b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨  b^{8, 45}_2
c    -b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_1
c    -b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨  b^{8, 45}_0
c  in DIMACS:
-10337 -10338  10339 -352  10340 0
-10337 -10338  10339 -352 -10341 0
-10337 -10338  10339 -352  10342 0

c  -1+1 --> 0
c    ( b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0 ∧  p_352) -> (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧ -b^{8, 45}_0)
c  in CNF:
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_2
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_1
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_0
c  in DIMACS:
-10337  10338 -10339 -352 -10340 0
-10337  10338 -10339 -352 -10341 0
-10337  10338 -10339 -352 -10342 0

c  0+1 --> 1
c    (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧  p_352) -> (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0)
c  in CNF:
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_2
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_1
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨  b^{8, 45}_0
c  in DIMACS:
 10337  10338  10339 -352 -10340 0
 10337  10338  10339 -352 -10341 0
 10337  10338  10339 -352  10342 0

c  1+1 --> 2
c    (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0 ∧  p_352) -> (-b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0)
c  in CNF:
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_2
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨  b^{8, 45}_1
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ -p_352 ∨ -b^{8, 45}_0
c  in DIMACS:
 10337  10338 -10339 -352 -10340 0
 10337  10338 -10339 -352  10341 0
 10337  10338 -10339 -352 -10342 0

c  2+1 --> break 
c    (-b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧  p_352) -> break
c  in CNF:
c     b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 10337 -10338  10339 -352 1162 0


c  2-1 --> 1
c    (-b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧ -p_352) -> (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0)
c  in CNF:
c     b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_2
c     b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_1
c     b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨  b^{8, 45}_0
c  in DIMACS:
 10337 -10338  10339  352 -10340 0
 10337 -10338  10339  352 -10341 0
 10337 -10338  10339  352  10342 0

c  1-1 --> 0
c    (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0 ∧ -p_352) -> (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧ -b^{8, 45}_0)
c  in CNF:
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_2
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_1
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_0
c  in DIMACS:
 10337  10338 -10339  352 -10340 0
 10337  10338 -10339  352 -10341 0
 10337  10338 -10339  352 -10342 0

c  0-1 --> -1
c    (-b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧ -p_352) -> ( b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0)
c  in CNF:
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨  b^{8, 45}_2
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_1
c     b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨  b^{8, 45}_0
c  in DIMACS:
 10337  10338  10339  352  10340 0
 10337  10338  10339  352 -10341 0
 10337  10338  10339  352  10342 0

c  -1-1 --> -2
c    ( b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧  b^{8, 44}_0 ∧ -p_352) -> ( b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0)
c  in CNF:
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨  b^{8, 45}_2
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨  b^{8, 45}_1
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨  p_352 ∨ -b^{8, 45}_0
c  in DIMACS:
-10337  10338 -10339  352  10340 0
-10337  10338 -10339  352  10341 0
-10337  10338 -10339  352 -10342 0

c  -2-1 --> break 
c    ( b^{8, 44}_2 ∧  b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨  b^{8, 44}_0 ∨  p_352 ∨ break
c  in DIMACS:
-10337 -10338  10339  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 44}_2 ∧ -b^{8, 44}_1 ∧ -b^{8, 44}_0 ∧ true) 
c  in CNF:
c    -b^{8, 44}_2 ∨  b^{8, 44}_1 ∨  b^{8, 44}_0 ∨ false 
c  in DIMACS:
-10337  10338  10339  0

c  3 does not represent an automaton state.
c    -(-b^{8, 44}_2 ∧  b^{8, 44}_1 ∧  b^{8, 44}_0 ∧ true) 
c  in CNF:
c     b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ false 
c  in DIMACS:
 10337 -10338 -10339  0
c  -3 does not represent an automaton state.
c    -( b^{8, 44}_2 ∧  b^{8, 44}_1 ∧  b^{8, 44}_0 ∧ true) 
c  in CNF:
c    -b^{8, 44}_2 ∨ -b^{8, 44}_1 ∨ -b^{8, 44}_0 ∨ false 
c  in DIMACS:
-10337 -10338 -10339  0

c i = 45
c  -2+1 --> -1
c    ( b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧  p_360) -> ( b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0)
c  in CNF:
c    -b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨  b^{8, 46}_2
c    -b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_1
c    -b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨  b^{8, 46}_0
c  in DIMACS:
-10340 -10341  10342 -360  10343 0
-10340 -10341  10342 -360 -10344 0
-10340 -10341  10342 -360  10345 0

c  -1+1 --> 0
c    ( b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0 ∧  p_360) -> (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧ -b^{8, 46}_0)
c  in CNF:
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_2
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_1
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_0
c  in DIMACS:
-10340  10341 -10342 -360 -10343 0
-10340  10341 -10342 -360 -10344 0
-10340  10341 -10342 -360 -10345 0

c  0+1 --> 1
c    (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧  p_360) -> (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0)
c  in CNF:
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_2
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_1
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨  b^{8, 46}_0
c  in DIMACS:
 10340  10341  10342 -360 -10343 0
 10340  10341  10342 -360 -10344 0
 10340  10341  10342 -360  10345 0

c  1+1 --> 2
c    (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0 ∧  p_360) -> (-b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0)
c  in CNF:
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_2
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨  b^{8, 46}_1
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ -p_360 ∨ -b^{8, 46}_0
c  in DIMACS:
 10340  10341 -10342 -360 -10343 0
 10340  10341 -10342 -360  10344 0
 10340  10341 -10342 -360 -10345 0

c  2+1 --> break 
c    (-b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧  p_360) -> break
c  in CNF:
c     b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 10340 -10341  10342 -360 1162 0


c  2-1 --> 1
c    (-b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧ -p_360) -> (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0)
c  in CNF:
c     b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_2
c     b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_1
c     b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨  b^{8, 46}_0
c  in DIMACS:
 10340 -10341  10342  360 -10343 0
 10340 -10341  10342  360 -10344 0
 10340 -10341  10342  360  10345 0

c  1-1 --> 0
c    (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0 ∧ -p_360) -> (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧ -b^{8, 46}_0)
c  in CNF:
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_2
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_1
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_0
c  in DIMACS:
 10340  10341 -10342  360 -10343 0
 10340  10341 -10342  360 -10344 0
 10340  10341 -10342  360 -10345 0

c  0-1 --> -1
c    (-b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧ -p_360) -> ( b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0)
c  in CNF:
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨  b^{8, 46}_2
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_1
c     b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨  b^{8, 46}_0
c  in DIMACS:
 10340  10341  10342  360  10343 0
 10340  10341  10342  360 -10344 0
 10340  10341  10342  360  10345 0

c  -1-1 --> -2
c    ( b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧  b^{8, 45}_0 ∧ -p_360) -> ( b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0)
c  in CNF:
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨  b^{8, 46}_2
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨  b^{8, 46}_1
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨  p_360 ∨ -b^{8, 46}_0
c  in DIMACS:
-10340  10341 -10342  360  10343 0
-10340  10341 -10342  360  10344 0
-10340  10341 -10342  360 -10345 0

c  -2-1 --> break 
c    ( b^{8, 45}_2 ∧  b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨  b^{8, 45}_0 ∨  p_360 ∨ break
c  in DIMACS:
-10340 -10341  10342  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 45}_2 ∧ -b^{8, 45}_1 ∧ -b^{8, 45}_0 ∧ true) 
c  in CNF:
c    -b^{8, 45}_2 ∨  b^{8, 45}_1 ∨  b^{8, 45}_0 ∨ false 
c  in DIMACS:
-10340  10341  10342  0

c  3 does not represent an automaton state.
c    -(-b^{8, 45}_2 ∧  b^{8, 45}_1 ∧  b^{8, 45}_0 ∧ true) 
c  in CNF:
c     b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ false 
c  in DIMACS:
 10340 -10341 -10342  0
c  -3 does not represent an automaton state.
c    -( b^{8, 45}_2 ∧  b^{8, 45}_1 ∧  b^{8, 45}_0 ∧ true) 
c  in CNF:
c    -b^{8, 45}_2 ∨ -b^{8, 45}_1 ∨ -b^{8, 45}_0 ∨ false 
c  in DIMACS:
-10340 -10341 -10342  0

c i = 46
c  -2+1 --> -1
c    ( b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧  p_368) -> ( b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0)
c  in CNF:
c    -b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨  b^{8, 47}_2
c    -b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_1
c    -b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨  b^{8, 47}_0
c  in DIMACS:
-10343 -10344  10345 -368  10346 0
-10343 -10344  10345 -368 -10347 0
-10343 -10344  10345 -368  10348 0

c  -1+1 --> 0
c    ( b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0 ∧  p_368) -> (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧ -b^{8, 47}_0)
c  in CNF:
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_2
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_1
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_0
c  in DIMACS:
-10343  10344 -10345 -368 -10346 0
-10343  10344 -10345 -368 -10347 0
-10343  10344 -10345 -368 -10348 0

c  0+1 --> 1
c    (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧  p_368) -> (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0)
c  in CNF:
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_2
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_1
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨  b^{8, 47}_0
c  in DIMACS:
 10343  10344  10345 -368 -10346 0
 10343  10344  10345 -368 -10347 0
 10343  10344  10345 -368  10348 0

c  1+1 --> 2
c    (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0 ∧  p_368) -> (-b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0)
c  in CNF:
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_2
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨  b^{8, 47}_1
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ -p_368 ∨ -b^{8, 47}_0
c  in DIMACS:
 10343  10344 -10345 -368 -10346 0
 10343  10344 -10345 -368  10347 0
 10343  10344 -10345 -368 -10348 0

c  2+1 --> break 
c    (-b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧  p_368) -> break
c  in CNF:
c     b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 10343 -10344  10345 -368 1162 0


c  2-1 --> 1
c    (-b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧ -p_368) -> (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0)
c  in CNF:
c     b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_2
c     b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_1
c     b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨  b^{8, 47}_0
c  in DIMACS:
 10343 -10344  10345  368 -10346 0
 10343 -10344  10345  368 -10347 0
 10343 -10344  10345  368  10348 0

c  1-1 --> 0
c    (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0 ∧ -p_368) -> (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧ -b^{8, 47}_0)
c  in CNF:
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_2
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_1
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_0
c  in DIMACS:
 10343  10344 -10345  368 -10346 0
 10343  10344 -10345  368 -10347 0
 10343  10344 -10345  368 -10348 0

c  0-1 --> -1
c    (-b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧ -p_368) -> ( b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0)
c  in CNF:
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨  b^{8, 47}_2
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_1
c     b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨  b^{8, 47}_0
c  in DIMACS:
 10343  10344  10345  368  10346 0
 10343  10344  10345  368 -10347 0
 10343  10344  10345  368  10348 0

c  -1-1 --> -2
c    ( b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧  b^{8, 46}_0 ∧ -p_368) -> ( b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0)
c  in CNF:
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨  b^{8, 47}_2
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨  b^{8, 47}_1
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨  p_368 ∨ -b^{8, 47}_0
c  in DIMACS:
-10343  10344 -10345  368  10346 0
-10343  10344 -10345  368  10347 0
-10343  10344 -10345  368 -10348 0

c  -2-1 --> break 
c    ( b^{8, 46}_2 ∧  b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨  b^{8, 46}_0 ∨  p_368 ∨ break
c  in DIMACS:
-10343 -10344  10345  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 46}_2 ∧ -b^{8, 46}_1 ∧ -b^{8, 46}_0 ∧ true) 
c  in CNF:
c    -b^{8, 46}_2 ∨  b^{8, 46}_1 ∨  b^{8, 46}_0 ∨ false 
c  in DIMACS:
-10343  10344  10345  0

c  3 does not represent an automaton state.
c    -(-b^{8, 46}_2 ∧  b^{8, 46}_1 ∧  b^{8, 46}_0 ∧ true) 
c  in CNF:
c     b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ false 
c  in DIMACS:
 10343 -10344 -10345  0
c  -3 does not represent an automaton state.
c    -( b^{8, 46}_2 ∧  b^{8, 46}_1 ∧  b^{8, 46}_0 ∧ true) 
c  in CNF:
c    -b^{8, 46}_2 ∨ -b^{8, 46}_1 ∨ -b^{8, 46}_0 ∨ false 
c  in DIMACS:
-10343 -10344 -10345  0

c i = 47
c  -2+1 --> -1
c    ( b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧  p_376) -> ( b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0)
c  in CNF:
c    -b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨  b^{8, 48}_2
c    -b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_1
c    -b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨  b^{8, 48}_0
c  in DIMACS:
-10346 -10347  10348 -376  10349 0
-10346 -10347  10348 -376 -10350 0
-10346 -10347  10348 -376  10351 0

c  -1+1 --> 0
c    ( b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0 ∧  p_376) -> (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧ -b^{8, 48}_0)
c  in CNF:
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_2
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_1
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_0
c  in DIMACS:
-10346  10347 -10348 -376 -10349 0
-10346  10347 -10348 -376 -10350 0
-10346  10347 -10348 -376 -10351 0

c  0+1 --> 1
c    (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧  p_376) -> (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0)
c  in CNF:
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_2
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_1
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨  b^{8, 48}_0
c  in DIMACS:
 10346  10347  10348 -376 -10349 0
 10346  10347  10348 -376 -10350 0
 10346  10347  10348 -376  10351 0

c  1+1 --> 2
c    (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0 ∧  p_376) -> (-b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0)
c  in CNF:
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_2
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨  b^{8, 48}_1
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ -p_376 ∨ -b^{8, 48}_0
c  in DIMACS:
 10346  10347 -10348 -376 -10349 0
 10346  10347 -10348 -376  10350 0
 10346  10347 -10348 -376 -10351 0

c  2+1 --> break 
c    (-b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧  p_376) -> break
c  in CNF:
c     b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 10346 -10347  10348 -376 1162 0


c  2-1 --> 1
c    (-b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧ -p_376) -> (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0)
c  in CNF:
c     b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_2
c     b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_1
c     b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨  b^{8, 48}_0
c  in DIMACS:
 10346 -10347  10348  376 -10349 0
 10346 -10347  10348  376 -10350 0
 10346 -10347  10348  376  10351 0

c  1-1 --> 0
c    (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0 ∧ -p_376) -> (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧ -b^{8, 48}_0)
c  in CNF:
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_2
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_1
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_0
c  in DIMACS:
 10346  10347 -10348  376 -10349 0
 10346  10347 -10348  376 -10350 0
 10346  10347 -10348  376 -10351 0

c  0-1 --> -1
c    (-b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧ -p_376) -> ( b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0)
c  in CNF:
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨  b^{8, 48}_2
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_1
c     b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨  b^{8, 48}_0
c  in DIMACS:
 10346  10347  10348  376  10349 0
 10346  10347  10348  376 -10350 0
 10346  10347  10348  376  10351 0

c  -1-1 --> -2
c    ( b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧  b^{8, 47}_0 ∧ -p_376) -> ( b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0)
c  in CNF:
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨  b^{8, 48}_2
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨  b^{8, 48}_1
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨  p_376 ∨ -b^{8, 48}_0
c  in DIMACS:
-10346  10347 -10348  376  10349 0
-10346  10347 -10348  376  10350 0
-10346  10347 -10348  376 -10351 0

c  -2-1 --> break 
c    ( b^{8, 47}_2 ∧  b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨  b^{8, 47}_0 ∨  p_376 ∨ break
c  in DIMACS:
-10346 -10347  10348  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 47}_2 ∧ -b^{8, 47}_1 ∧ -b^{8, 47}_0 ∧ true) 
c  in CNF:
c    -b^{8, 47}_2 ∨  b^{8, 47}_1 ∨  b^{8, 47}_0 ∨ false 
c  in DIMACS:
-10346  10347  10348  0

c  3 does not represent an automaton state.
c    -(-b^{8, 47}_2 ∧  b^{8, 47}_1 ∧  b^{8, 47}_0 ∧ true) 
c  in CNF:
c     b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ false 
c  in DIMACS:
 10346 -10347 -10348  0
c  -3 does not represent an automaton state.
c    -( b^{8, 47}_2 ∧  b^{8, 47}_1 ∧  b^{8, 47}_0 ∧ true) 
c  in CNF:
c    -b^{8, 47}_2 ∨ -b^{8, 47}_1 ∨ -b^{8, 47}_0 ∨ false 
c  in DIMACS:
-10346 -10347 -10348  0

c i = 48
c  -2+1 --> -1
c    ( b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧  p_384) -> ( b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0)
c  in CNF:
c    -b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨  b^{8, 49}_2
c    -b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_1
c    -b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨  b^{8, 49}_0
c  in DIMACS:
-10349 -10350  10351 -384  10352 0
-10349 -10350  10351 -384 -10353 0
-10349 -10350  10351 -384  10354 0

c  -1+1 --> 0
c    ( b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0 ∧  p_384) -> (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧ -b^{8, 49}_0)
c  in CNF:
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_2
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_1
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_0
c  in DIMACS:
-10349  10350 -10351 -384 -10352 0
-10349  10350 -10351 -384 -10353 0
-10349  10350 -10351 -384 -10354 0

c  0+1 --> 1
c    (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧  p_384) -> (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0)
c  in CNF:
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_2
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_1
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨  b^{8, 49}_0
c  in DIMACS:
 10349  10350  10351 -384 -10352 0
 10349  10350  10351 -384 -10353 0
 10349  10350  10351 -384  10354 0

c  1+1 --> 2
c    (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0 ∧  p_384) -> (-b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0)
c  in CNF:
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_2
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨  b^{8, 49}_1
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ -p_384 ∨ -b^{8, 49}_0
c  in DIMACS:
 10349  10350 -10351 -384 -10352 0
 10349  10350 -10351 -384  10353 0
 10349  10350 -10351 -384 -10354 0

c  2+1 --> break 
c    (-b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧  p_384) -> break
c  in CNF:
c     b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 10349 -10350  10351 -384 1162 0


c  2-1 --> 1
c    (-b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧ -p_384) -> (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0)
c  in CNF:
c     b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_2
c     b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_1
c     b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨  b^{8, 49}_0
c  in DIMACS:
 10349 -10350  10351  384 -10352 0
 10349 -10350  10351  384 -10353 0
 10349 -10350  10351  384  10354 0

c  1-1 --> 0
c    (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0 ∧ -p_384) -> (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧ -b^{8, 49}_0)
c  in CNF:
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_2
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_1
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_0
c  in DIMACS:
 10349  10350 -10351  384 -10352 0
 10349  10350 -10351  384 -10353 0
 10349  10350 -10351  384 -10354 0

c  0-1 --> -1
c    (-b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧ -p_384) -> ( b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0)
c  in CNF:
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨  b^{8, 49}_2
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_1
c     b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨  b^{8, 49}_0
c  in DIMACS:
 10349  10350  10351  384  10352 0
 10349  10350  10351  384 -10353 0
 10349  10350  10351  384  10354 0

c  -1-1 --> -2
c    ( b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧  b^{8, 48}_0 ∧ -p_384) -> ( b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0)
c  in CNF:
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨  b^{8, 49}_2
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨  b^{8, 49}_1
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨  p_384 ∨ -b^{8, 49}_0
c  in DIMACS:
-10349  10350 -10351  384  10352 0
-10349  10350 -10351  384  10353 0
-10349  10350 -10351  384 -10354 0

c  -2-1 --> break 
c    ( b^{8, 48}_2 ∧  b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨  b^{8, 48}_0 ∨  p_384 ∨ break
c  in DIMACS:
-10349 -10350  10351  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 48}_2 ∧ -b^{8, 48}_1 ∧ -b^{8, 48}_0 ∧ true) 
c  in CNF:
c    -b^{8, 48}_2 ∨  b^{8, 48}_1 ∨  b^{8, 48}_0 ∨ false 
c  in DIMACS:
-10349  10350  10351  0

c  3 does not represent an automaton state.
c    -(-b^{8, 48}_2 ∧  b^{8, 48}_1 ∧  b^{8, 48}_0 ∧ true) 
c  in CNF:
c     b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ false 
c  in DIMACS:
 10349 -10350 -10351  0
c  -3 does not represent an automaton state.
c    -( b^{8, 48}_2 ∧  b^{8, 48}_1 ∧  b^{8, 48}_0 ∧ true) 
c  in CNF:
c    -b^{8, 48}_2 ∨ -b^{8, 48}_1 ∨ -b^{8, 48}_0 ∨ false 
c  in DIMACS:
-10349 -10350 -10351  0

c i = 49
c  -2+1 --> -1
c    ( b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧  p_392) -> ( b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0)
c  in CNF:
c    -b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨  b^{8, 50}_2
c    -b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_1
c    -b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨  b^{8, 50}_0
c  in DIMACS:
-10352 -10353  10354 -392  10355 0
-10352 -10353  10354 -392 -10356 0
-10352 -10353  10354 -392  10357 0

c  -1+1 --> 0
c    ( b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0 ∧  p_392) -> (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧ -b^{8, 50}_0)
c  in CNF:
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_2
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_1
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_0
c  in DIMACS:
-10352  10353 -10354 -392 -10355 0
-10352  10353 -10354 -392 -10356 0
-10352  10353 -10354 -392 -10357 0

c  0+1 --> 1
c    (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧  p_392) -> (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0)
c  in CNF:
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_2
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_1
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨  b^{8, 50}_0
c  in DIMACS:
 10352  10353  10354 -392 -10355 0
 10352  10353  10354 -392 -10356 0
 10352  10353  10354 -392  10357 0

c  1+1 --> 2
c    (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0 ∧  p_392) -> (-b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0)
c  in CNF:
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_2
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨  b^{8, 50}_1
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ -p_392 ∨ -b^{8, 50}_0
c  in DIMACS:
 10352  10353 -10354 -392 -10355 0
 10352  10353 -10354 -392  10356 0
 10352  10353 -10354 -392 -10357 0

c  2+1 --> break 
c    (-b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧  p_392) -> break
c  in CNF:
c     b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 10352 -10353  10354 -392 1162 0


c  2-1 --> 1
c    (-b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧ -p_392) -> (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0)
c  in CNF:
c     b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_2
c     b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_1
c     b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨  b^{8, 50}_0
c  in DIMACS:
 10352 -10353  10354  392 -10355 0
 10352 -10353  10354  392 -10356 0
 10352 -10353  10354  392  10357 0

c  1-1 --> 0
c    (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0 ∧ -p_392) -> (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧ -b^{8, 50}_0)
c  in CNF:
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_2
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_1
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_0
c  in DIMACS:
 10352  10353 -10354  392 -10355 0
 10352  10353 -10354  392 -10356 0
 10352  10353 -10354  392 -10357 0

c  0-1 --> -1
c    (-b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧ -p_392) -> ( b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0)
c  in CNF:
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨  b^{8, 50}_2
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_1
c     b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨  b^{8, 50}_0
c  in DIMACS:
 10352  10353  10354  392  10355 0
 10352  10353  10354  392 -10356 0
 10352  10353  10354  392  10357 0

c  -1-1 --> -2
c    ( b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧  b^{8, 49}_0 ∧ -p_392) -> ( b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0)
c  in CNF:
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨  b^{8, 50}_2
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨  b^{8, 50}_1
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨  p_392 ∨ -b^{8, 50}_0
c  in DIMACS:
-10352  10353 -10354  392  10355 0
-10352  10353 -10354  392  10356 0
-10352  10353 -10354  392 -10357 0

c  -2-1 --> break 
c    ( b^{8, 49}_2 ∧  b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨  b^{8, 49}_0 ∨  p_392 ∨ break
c  in DIMACS:
-10352 -10353  10354  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 49}_2 ∧ -b^{8, 49}_1 ∧ -b^{8, 49}_0 ∧ true) 
c  in CNF:
c    -b^{8, 49}_2 ∨  b^{8, 49}_1 ∨  b^{8, 49}_0 ∨ false 
c  in DIMACS:
-10352  10353  10354  0

c  3 does not represent an automaton state.
c    -(-b^{8, 49}_2 ∧  b^{8, 49}_1 ∧  b^{8, 49}_0 ∧ true) 
c  in CNF:
c     b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ false 
c  in DIMACS:
 10352 -10353 -10354  0
c  -3 does not represent an automaton state.
c    -( b^{8, 49}_2 ∧  b^{8, 49}_1 ∧  b^{8, 49}_0 ∧ true) 
c  in CNF:
c    -b^{8, 49}_2 ∨ -b^{8, 49}_1 ∨ -b^{8, 49}_0 ∨ false 
c  in DIMACS:
-10352 -10353 -10354  0

c i = 50
c  -2+1 --> -1
c    ( b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧  p_400) -> ( b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0)
c  in CNF:
c    -b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨  b^{8, 51}_2
c    -b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_1
c    -b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨  b^{8, 51}_0
c  in DIMACS:
-10355 -10356  10357 -400  10358 0
-10355 -10356  10357 -400 -10359 0
-10355 -10356  10357 -400  10360 0

c  -1+1 --> 0
c    ( b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0 ∧  p_400) -> (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧ -b^{8, 51}_0)
c  in CNF:
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_2
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_1
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_0
c  in DIMACS:
-10355  10356 -10357 -400 -10358 0
-10355  10356 -10357 -400 -10359 0
-10355  10356 -10357 -400 -10360 0

c  0+1 --> 1
c    (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧  p_400) -> (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0)
c  in CNF:
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_2
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_1
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨  b^{8, 51}_0
c  in DIMACS:
 10355  10356  10357 -400 -10358 0
 10355  10356  10357 -400 -10359 0
 10355  10356  10357 -400  10360 0

c  1+1 --> 2
c    (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0 ∧  p_400) -> (-b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0)
c  in CNF:
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_2
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨  b^{8, 51}_1
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ -p_400 ∨ -b^{8, 51}_0
c  in DIMACS:
 10355  10356 -10357 -400 -10358 0
 10355  10356 -10357 -400  10359 0
 10355  10356 -10357 -400 -10360 0

c  2+1 --> break 
c    (-b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧  p_400) -> break
c  in CNF:
c     b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 10355 -10356  10357 -400 1162 0


c  2-1 --> 1
c    (-b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧ -p_400) -> (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0)
c  in CNF:
c     b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_2
c     b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_1
c     b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨  b^{8, 51}_0
c  in DIMACS:
 10355 -10356  10357  400 -10358 0
 10355 -10356  10357  400 -10359 0
 10355 -10356  10357  400  10360 0

c  1-1 --> 0
c    (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0 ∧ -p_400) -> (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧ -b^{8, 51}_0)
c  in CNF:
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_2
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_1
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_0
c  in DIMACS:
 10355  10356 -10357  400 -10358 0
 10355  10356 -10357  400 -10359 0
 10355  10356 -10357  400 -10360 0

c  0-1 --> -1
c    (-b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧ -p_400) -> ( b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0)
c  in CNF:
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨  b^{8, 51}_2
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_1
c     b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨  b^{8, 51}_0
c  in DIMACS:
 10355  10356  10357  400  10358 0
 10355  10356  10357  400 -10359 0
 10355  10356  10357  400  10360 0

c  -1-1 --> -2
c    ( b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧  b^{8, 50}_0 ∧ -p_400) -> ( b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0)
c  in CNF:
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨  b^{8, 51}_2
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨  b^{8, 51}_1
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨  p_400 ∨ -b^{8, 51}_0
c  in DIMACS:
-10355  10356 -10357  400  10358 0
-10355  10356 -10357  400  10359 0
-10355  10356 -10357  400 -10360 0

c  -2-1 --> break 
c    ( b^{8, 50}_2 ∧  b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨  b^{8, 50}_0 ∨  p_400 ∨ break
c  in DIMACS:
-10355 -10356  10357  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 50}_2 ∧ -b^{8, 50}_1 ∧ -b^{8, 50}_0 ∧ true) 
c  in CNF:
c    -b^{8, 50}_2 ∨  b^{8, 50}_1 ∨  b^{8, 50}_0 ∨ false 
c  in DIMACS:
-10355  10356  10357  0

c  3 does not represent an automaton state.
c    -(-b^{8, 50}_2 ∧  b^{8, 50}_1 ∧  b^{8, 50}_0 ∧ true) 
c  in CNF:
c     b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ false 
c  in DIMACS:
 10355 -10356 -10357  0
c  -3 does not represent an automaton state.
c    -( b^{8, 50}_2 ∧  b^{8, 50}_1 ∧  b^{8, 50}_0 ∧ true) 
c  in CNF:
c    -b^{8, 50}_2 ∨ -b^{8, 50}_1 ∨ -b^{8, 50}_0 ∨ false 
c  in DIMACS:
-10355 -10356 -10357  0

c i = 51
c  -2+1 --> -1
c    ( b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧  p_408) -> ( b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0)
c  in CNF:
c    -b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨  b^{8, 52}_2
c    -b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_1
c    -b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨  b^{8, 52}_0
c  in DIMACS:
-10358 -10359  10360 -408  10361 0
-10358 -10359  10360 -408 -10362 0
-10358 -10359  10360 -408  10363 0

c  -1+1 --> 0
c    ( b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0 ∧  p_408) -> (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧ -b^{8, 52}_0)
c  in CNF:
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_2
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_1
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_0
c  in DIMACS:
-10358  10359 -10360 -408 -10361 0
-10358  10359 -10360 -408 -10362 0
-10358  10359 -10360 -408 -10363 0

c  0+1 --> 1
c    (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧  p_408) -> (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0)
c  in CNF:
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_2
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_1
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨  b^{8, 52}_0
c  in DIMACS:
 10358  10359  10360 -408 -10361 0
 10358  10359  10360 -408 -10362 0
 10358  10359  10360 -408  10363 0

c  1+1 --> 2
c    (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0 ∧  p_408) -> (-b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0)
c  in CNF:
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_2
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨  b^{8, 52}_1
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ -p_408 ∨ -b^{8, 52}_0
c  in DIMACS:
 10358  10359 -10360 -408 -10361 0
 10358  10359 -10360 -408  10362 0
 10358  10359 -10360 -408 -10363 0

c  2+1 --> break 
c    (-b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧  p_408) -> break
c  in CNF:
c     b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 10358 -10359  10360 -408 1162 0


c  2-1 --> 1
c    (-b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧ -p_408) -> (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0)
c  in CNF:
c     b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_2
c     b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_1
c     b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨  b^{8, 52}_0
c  in DIMACS:
 10358 -10359  10360  408 -10361 0
 10358 -10359  10360  408 -10362 0
 10358 -10359  10360  408  10363 0

c  1-1 --> 0
c    (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0 ∧ -p_408) -> (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧ -b^{8, 52}_0)
c  in CNF:
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_2
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_1
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_0
c  in DIMACS:
 10358  10359 -10360  408 -10361 0
 10358  10359 -10360  408 -10362 0
 10358  10359 -10360  408 -10363 0

c  0-1 --> -1
c    (-b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧ -p_408) -> ( b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0)
c  in CNF:
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨  b^{8, 52}_2
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_1
c     b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨  b^{8, 52}_0
c  in DIMACS:
 10358  10359  10360  408  10361 0
 10358  10359  10360  408 -10362 0
 10358  10359  10360  408  10363 0

c  -1-1 --> -2
c    ( b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧  b^{8, 51}_0 ∧ -p_408) -> ( b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0)
c  in CNF:
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨  b^{8, 52}_2
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨  b^{8, 52}_1
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨  p_408 ∨ -b^{8, 52}_0
c  in DIMACS:
-10358  10359 -10360  408  10361 0
-10358  10359 -10360  408  10362 0
-10358  10359 -10360  408 -10363 0

c  -2-1 --> break 
c    ( b^{8, 51}_2 ∧  b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨  b^{8, 51}_0 ∨  p_408 ∨ break
c  in DIMACS:
-10358 -10359  10360  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 51}_2 ∧ -b^{8, 51}_1 ∧ -b^{8, 51}_0 ∧ true) 
c  in CNF:
c    -b^{8, 51}_2 ∨  b^{8, 51}_1 ∨  b^{8, 51}_0 ∨ false 
c  in DIMACS:
-10358  10359  10360  0

c  3 does not represent an automaton state.
c    -(-b^{8, 51}_2 ∧  b^{8, 51}_1 ∧  b^{8, 51}_0 ∧ true) 
c  in CNF:
c     b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ false 
c  in DIMACS:
 10358 -10359 -10360  0
c  -3 does not represent an automaton state.
c    -( b^{8, 51}_2 ∧  b^{8, 51}_1 ∧  b^{8, 51}_0 ∧ true) 
c  in CNF:
c    -b^{8, 51}_2 ∨ -b^{8, 51}_1 ∨ -b^{8, 51}_0 ∨ false 
c  in DIMACS:
-10358 -10359 -10360  0

c i = 52
c  -2+1 --> -1
c    ( b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧  p_416) -> ( b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0)
c  in CNF:
c    -b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨  b^{8, 53}_2
c    -b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_1
c    -b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨  b^{8, 53}_0
c  in DIMACS:
-10361 -10362  10363 -416  10364 0
-10361 -10362  10363 -416 -10365 0
-10361 -10362  10363 -416  10366 0

c  -1+1 --> 0
c    ( b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0 ∧  p_416) -> (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧ -b^{8, 53}_0)
c  in CNF:
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_2
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_1
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_0
c  in DIMACS:
-10361  10362 -10363 -416 -10364 0
-10361  10362 -10363 -416 -10365 0
-10361  10362 -10363 -416 -10366 0

c  0+1 --> 1
c    (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧  p_416) -> (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0)
c  in CNF:
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_2
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_1
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨  b^{8, 53}_0
c  in DIMACS:
 10361  10362  10363 -416 -10364 0
 10361  10362  10363 -416 -10365 0
 10361  10362  10363 -416  10366 0

c  1+1 --> 2
c    (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0 ∧  p_416) -> (-b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0)
c  in CNF:
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_2
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨  b^{8, 53}_1
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ -p_416 ∨ -b^{8, 53}_0
c  in DIMACS:
 10361  10362 -10363 -416 -10364 0
 10361  10362 -10363 -416  10365 0
 10361  10362 -10363 -416 -10366 0

c  2+1 --> break 
c    (-b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧  p_416) -> break
c  in CNF:
c     b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 10361 -10362  10363 -416 1162 0


c  2-1 --> 1
c    (-b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧ -p_416) -> (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0)
c  in CNF:
c     b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_2
c     b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_1
c     b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨  b^{8, 53}_0
c  in DIMACS:
 10361 -10362  10363  416 -10364 0
 10361 -10362  10363  416 -10365 0
 10361 -10362  10363  416  10366 0

c  1-1 --> 0
c    (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0 ∧ -p_416) -> (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧ -b^{8, 53}_0)
c  in CNF:
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_2
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_1
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_0
c  in DIMACS:
 10361  10362 -10363  416 -10364 0
 10361  10362 -10363  416 -10365 0
 10361  10362 -10363  416 -10366 0

c  0-1 --> -1
c    (-b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧ -p_416) -> ( b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0)
c  in CNF:
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨  b^{8, 53}_2
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_1
c     b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨  b^{8, 53}_0
c  in DIMACS:
 10361  10362  10363  416  10364 0
 10361  10362  10363  416 -10365 0
 10361  10362  10363  416  10366 0

c  -1-1 --> -2
c    ( b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧  b^{8, 52}_0 ∧ -p_416) -> ( b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0)
c  in CNF:
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨  b^{8, 53}_2
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨  b^{8, 53}_1
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨  p_416 ∨ -b^{8, 53}_0
c  in DIMACS:
-10361  10362 -10363  416  10364 0
-10361  10362 -10363  416  10365 0
-10361  10362 -10363  416 -10366 0

c  -2-1 --> break 
c    ( b^{8, 52}_2 ∧  b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨  b^{8, 52}_0 ∨  p_416 ∨ break
c  in DIMACS:
-10361 -10362  10363  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 52}_2 ∧ -b^{8, 52}_1 ∧ -b^{8, 52}_0 ∧ true) 
c  in CNF:
c    -b^{8, 52}_2 ∨  b^{8, 52}_1 ∨  b^{8, 52}_0 ∨ false 
c  in DIMACS:
-10361  10362  10363  0

c  3 does not represent an automaton state.
c    -(-b^{8, 52}_2 ∧  b^{8, 52}_1 ∧  b^{8, 52}_0 ∧ true) 
c  in CNF:
c     b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ false 
c  in DIMACS:
 10361 -10362 -10363  0
c  -3 does not represent an automaton state.
c    -( b^{8, 52}_2 ∧  b^{8, 52}_1 ∧  b^{8, 52}_0 ∧ true) 
c  in CNF:
c    -b^{8, 52}_2 ∨ -b^{8, 52}_1 ∨ -b^{8, 52}_0 ∨ false 
c  in DIMACS:
-10361 -10362 -10363  0

c i = 53
c  -2+1 --> -1
c    ( b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧  p_424) -> ( b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0)
c  in CNF:
c    -b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨  b^{8, 54}_2
c    -b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_1
c    -b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨  b^{8, 54}_0
c  in DIMACS:
-10364 -10365  10366 -424  10367 0
-10364 -10365  10366 -424 -10368 0
-10364 -10365  10366 -424  10369 0

c  -1+1 --> 0
c    ( b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0 ∧  p_424) -> (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧ -b^{8, 54}_0)
c  in CNF:
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_2
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_1
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_0
c  in DIMACS:
-10364  10365 -10366 -424 -10367 0
-10364  10365 -10366 -424 -10368 0
-10364  10365 -10366 -424 -10369 0

c  0+1 --> 1
c    (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧  p_424) -> (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0)
c  in CNF:
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_2
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_1
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨  b^{8, 54}_0
c  in DIMACS:
 10364  10365  10366 -424 -10367 0
 10364  10365  10366 -424 -10368 0
 10364  10365  10366 -424  10369 0

c  1+1 --> 2
c    (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0 ∧  p_424) -> (-b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0)
c  in CNF:
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_2
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨  b^{8, 54}_1
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ -p_424 ∨ -b^{8, 54}_0
c  in DIMACS:
 10364  10365 -10366 -424 -10367 0
 10364  10365 -10366 -424  10368 0
 10364  10365 -10366 -424 -10369 0

c  2+1 --> break 
c    (-b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧  p_424) -> break
c  in CNF:
c     b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 10364 -10365  10366 -424 1162 0


c  2-1 --> 1
c    (-b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧ -p_424) -> (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0)
c  in CNF:
c     b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_2
c     b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_1
c     b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨  b^{8, 54}_0
c  in DIMACS:
 10364 -10365  10366  424 -10367 0
 10364 -10365  10366  424 -10368 0
 10364 -10365  10366  424  10369 0

c  1-1 --> 0
c    (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0 ∧ -p_424) -> (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧ -b^{8, 54}_0)
c  in CNF:
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_2
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_1
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_0
c  in DIMACS:
 10364  10365 -10366  424 -10367 0
 10364  10365 -10366  424 -10368 0
 10364  10365 -10366  424 -10369 0

c  0-1 --> -1
c    (-b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧ -p_424) -> ( b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0)
c  in CNF:
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨  b^{8, 54}_2
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_1
c     b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨  b^{8, 54}_0
c  in DIMACS:
 10364  10365  10366  424  10367 0
 10364  10365  10366  424 -10368 0
 10364  10365  10366  424  10369 0

c  -1-1 --> -2
c    ( b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧  b^{8, 53}_0 ∧ -p_424) -> ( b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0)
c  in CNF:
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨  b^{8, 54}_2
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨  b^{8, 54}_1
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨  p_424 ∨ -b^{8, 54}_0
c  in DIMACS:
-10364  10365 -10366  424  10367 0
-10364  10365 -10366  424  10368 0
-10364  10365 -10366  424 -10369 0

c  -2-1 --> break 
c    ( b^{8, 53}_2 ∧  b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨  b^{8, 53}_0 ∨  p_424 ∨ break
c  in DIMACS:
-10364 -10365  10366  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 53}_2 ∧ -b^{8, 53}_1 ∧ -b^{8, 53}_0 ∧ true) 
c  in CNF:
c    -b^{8, 53}_2 ∨  b^{8, 53}_1 ∨  b^{8, 53}_0 ∨ false 
c  in DIMACS:
-10364  10365  10366  0

c  3 does not represent an automaton state.
c    -(-b^{8, 53}_2 ∧  b^{8, 53}_1 ∧  b^{8, 53}_0 ∧ true) 
c  in CNF:
c     b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ false 
c  in DIMACS:
 10364 -10365 -10366  0
c  -3 does not represent an automaton state.
c    -( b^{8, 53}_2 ∧  b^{8, 53}_1 ∧  b^{8, 53}_0 ∧ true) 
c  in CNF:
c    -b^{8, 53}_2 ∨ -b^{8, 53}_1 ∨ -b^{8, 53}_0 ∨ false 
c  in DIMACS:
-10364 -10365 -10366  0

c i = 54
c  -2+1 --> -1
c    ( b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧  p_432) -> ( b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0)
c  in CNF:
c    -b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨  b^{8, 55}_2
c    -b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_1
c    -b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨  b^{8, 55}_0
c  in DIMACS:
-10367 -10368  10369 -432  10370 0
-10367 -10368  10369 -432 -10371 0
-10367 -10368  10369 -432  10372 0

c  -1+1 --> 0
c    ( b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0 ∧  p_432) -> (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧ -b^{8, 55}_0)
c  in CNF:
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_2
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_1
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_0
c  in DIMACS:
-10367  10368 -10369 -432 -10370 0
-10367  10368 -10369 -432 -10371 0
-10367  10368 -10369 -432 -10372 0

c  0+1 --> 1
c    (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧  p_432) -> (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0)
c  in CNF:
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_2
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_1
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨  b^{8, 55}_0
c  in DIMACS:
 10367  10368  10369 -432 -10370 0
 10367  10368  10369 -432 -10371 0
 10367  10368  10369 -432  10372 0

c  1+1 --> 2
c    (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0 ∧  p_432) -> (-b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0)
c  in CNF:
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_2
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨  b^{8, 55}_1
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ -p_432 ∨ -b^{8, 55}_0
c  in DIMACS:
 10367  10368 -10369 -432 -10370 0
 10367  10368 -10369 -432  10371 0
 10367  10368 -10369 -432 -10372 0

c  2+1 --> break 
c    (-b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧  p_432) -> break
c  in CNF:
c     b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 10367 -10368  10369 -432 1162 0


c  2-1 --> 1
c    (-b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧ -p_432) -> (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0)
c  in CNF:
c     b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_2
c     b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_1
c     b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨  b^{8, 55}_0
c  in DIMACS:
 10367 -10368  10369  432 -10370 0
 10367 -10368  10369  432 -10371 0
 10367 -10368  10369  432  10372 0

c  1-1 --> 0
c    (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0 ∧ -p_432) -> (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧ -b^{8, 55}_0)
c  in CNF:
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_2
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_1
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_0
c  in DIMACS:
 10367  10368 -10369  432 -10370 0
 10367  10368 -10369  432 -10371 0
 10367  10368 -10369  432 -10372 0

c  0-1 --> -1
c    (-b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧ -p_432) -> ( b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0)
c  in CNF:
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨  b^{8, 55}_2
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_1
c     b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨  b^{8, 55}_0
c  in DIMACS:
 10367  10368  10369  432  10370 0
 10367  10368  10369  432 -10371 0
 10367  10368  10369  432  10372 0

c  -1-1 --> -2
c    ( b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧  b^{8, 54}_0 ∧ -p_432) -> ( b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0)
c  in CNF:
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨  b^{8, 55}_2
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨  b^{8, 55}_1
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨  p_432 ∨ -b^{8, 55}_0
c  in DIMACS:
-10367  10368 -10369  432  10370 0
-10367  10368 -10369  432  10371 0
-10367  10368 -10369  432 -10372 0

c  -2-1 --> break 
c    ( b^{8, 54}_2 ∧  b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨  b^{8, 54}_0 ∨  p_432 ∨ break
c  in DIMACS:
-10367 -10368  10369  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 54}_2 ∧ -b^{8, 54}_1 ∧ -b^{8, 54}_0 ∧ true) 
c  in CNF:
c    -b^{8, 54}_2 ∨  b^{8, 54}_1 ∨  b^{8, 54}_0 ∨ false 
c  in DIMACS:
-10367  10368  10369  0

c  3 does not represent an automaton state.
c    -(-b^{8, 54}_2 ∧  b^{8, 54}_1 ∧  b^{8, 54}_0 ∧ true) 
c  in CNF:
c     b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ false 
c  in DIMACS:
 10367 -10368 -10369  0
c  -3 does not represent an automaton state.
c    -( b^{8, 54}_2 ∧  b^{8, 54}_1 ∧  b^{8, 54}_0 ∧ true) 
c  in CNF:
c    -b^{8, 54}_2 ∨ -b^{8, 54}_1 ∨ -b^{8, 54}_0 ∨ false 
c  in DIMACS:
-10367 -10368 -10369  0

c i = 55
c  -2+1 --> -1
c    ( b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧  p_440) -> ( b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0)
c  in CNF:
c    -b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨  b^{8, 56}_2
c    -b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_1
c    -b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨  b^{8, 56}_0
c  in DIMACS:
-10370 -10371  10372 -440  10373 0
-10370 -10371  10372 -440 -10374 0
-10370 -10371  10372 -440  10375 0

c  -1+1 --> 0
c    ( b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0 ∧  p_440) -> (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧ -b^{8, 56}_0)
c  in CNF:
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_2
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_1
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_0
c  in DIMACS:
-10370  10371 -10372 -440 -10373 0
-10370  10371 -10372 -440 -10374 0
-10370  10371 -10372 -440 -10375 0

c  0+1 --> 1
c    (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧  p_440) -> (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0)
c  in CNF:
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_2
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_1
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨  b^{8, 56}_0
c  in DIMACS:
 10370  10371  10372 -440 -10373 0
 10370  10371  10372 -440 -10374 0
 10370  10371  10372 -440  10375 0

c  1+1 --> 2
c    (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0 ∧  p_440) -> (-b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0)
c  in CNF:
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_2
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨  b^{8, 56}_1
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ -p_440 ∨ -b^{8, 56}_0
c  in DIMACS:
 10370  10371 -10372 -440 -10373 0
 10370  10371 -10372 -440  10374 0
 10370  10371 -10372 -440 -10375 0

c  2+1 --> break 
c    (-b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧  p_440) -> break
c  in CNF:
c     b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 10370 -10371  10372 -440 1162 0


c  2-1 --> 1
c    (-b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧ -p_440) -> (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0)
c  in CNF:
c     b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_2
c     b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_1
c     b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨  b^{8, 56}_0
c  in DIMACS:
 10370 -10371  10372  440 -10373 0
 10370 -10371  10372  440 -10374 0
 10370 -10371  10372  440  10375 0

c  1-1 --> 0
c    (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0 ∧ -p_440) -> (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧ -b^{8, 56}_0)
c  in CNF:
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_2
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_1
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_0
c  in DIMACS:
 10370  10371 -10372  440 -10373 0
 10370  10371 -10372  440 -10374 0
 10370  10371 -10372  440 -10375 0

c  0-1 --> -1
c    (-b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧ -p_440) -> ( b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0)
c  in CNF:
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨  b^{8, 56}_2
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_1
c     b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨  b^{8, 56}_0
c  in DIMACS:
 10370  10371  10372  440  10373 0
 10370  10371  10372  440 -10374 0
 10370  10371  10372  440  10375 0

c  -1-1 --> -2
c    ( b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧  b^{8, 55}_0 ∧ -p_440) -> ( b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0)
c  in CNF:
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨  b^{8, 56}_2
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨  b^{8, 56}_1
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨  p_440 ∨ -b^{8, 56}_0
c  in DIMACS:
-10370  10371 -10372  440  10373 0
-10370  10371 -10372  440  10374 0
-10370  10371 -10372  440 -10375 0

c  -2-1 --> break 
c    ( b^{8, 55}_2 ∧  b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨  b^{8, 55}_0 ∨  p_440 ∨ break
c  in DIMACS:
-10370 -10371  10372  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 55}_2 ∧ -b^{8, 55}_1 ∧ -b^{8, 55}_0 ∧ true) 
c  in CNF:
c    -b^{8, 55}_2 ∨  b^{8, 55}_1 ∨  b^{8, 55}_0 ∨ false 
c  in DIMACS:
-10370  10371  10372  0

c  3 does not represent an automaton state.
c    -(-b^{8, 55}_2 ∧  b^{8, 55}_1 ∧  b^{8, 55}_0 ∧ true) 
c  in CNF:
c     b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ false 
c  in DIMACS:
 10370 -10371 -10372  0
c  -3 does not represent an automaton state.
c    -( b^{8, 55}_2 ∧  b^{8, 55}_1 ∧  b^{8, 55}_0 ∧ true) 
c  in CNF:
c    -b^{8, 55}_2 ∨ -b^{8, 55}_1 ∨ -b^{8, 55}_0 ∨ false 
c  in DIMACS:
-10370 -10371 -10372  0

c i = 56
c  -2+1 --> -1
c    ( b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧  p_448) -> ( b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0)
c  in CNF:
c    -b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨  b^{8, 57}_2
c    -b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_1
c    -b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨  b^{8, 57}_0
c  in DIMACS:
-10373 -10374  10375 -448  10376 0
-10373 -10374  10375 -448 -10377 0
-10373 -10374  10375 -448  10378 0

c  -1+1 --> 0
c    ( b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0 ∧  p_448) -> (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧ -b^{8, 57}_0)
c  in CNF:
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_2
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_1
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_0
c  in DIMACS:
-10373  10374 -10375 -448 -10376 0
-10373  10374 -10375 -448 -10377 0
-10373  10374 -10375 -448 -10378 0

c  0+1 --> 1
c    (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧  p_448) -> (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0)
c  in CNF:
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_2
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_1
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨  b^{8, 57}_0
c  in DIMACS:
 10373  10374  10375 -448 -10376 0
 10373  10374  10375 -448 -10377 0
 10373  10374  10375 -448  10378 0

c  1+1 --> 2
c    (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0 ∧  p_448) -> (-b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0)
c  in CNF:
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_2
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨  b^{8, 57}_1
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ -p_448 ∨ -b^{8, 57}_0
c  in DIMACS:
 10373  10374 -10375 -448 -10376 0
 10373  10374 -10375 -448  10377 0
 10373  10374 -10375 -448 -10378 0

c  2+1 --> break 
c    (-b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧  p_448) -> break
c  in CNF:
c     b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 10373 -10374  10375 -448 1162 0


c  2-1 --> 1
c    (-b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧ -p_448) -> (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0)
c  in CNF:
c     b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_2
c     b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_1
c     b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨  b^{8, 57}_0
c  in DIMACS:
 10373 -10374  10375  448 -10376 0
 10373 -10374  10375  448 -10377 0
 10373 -10374  10375  448  10378 0

c  1-1 --> 0
c    (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0 ∧ -p_448) -> (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧ -b^{8, 57}_0)
c  in CNF:
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_2
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_1
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_0
c  in DIMACS:
 10373  10374 -10375  448 -10376 0
 10373  10374 -10375  448 -10377 0
 10373  10374 -10375  448 -10378 0

c  0-1 --> -1
c    (-b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧ -p_448) -> ( b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0)
c  in CNF:
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨  b^{8, 57}_2
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_1
c     b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨  b^{8, 57}_0
c  in DIMACS:
 10373  10374  10375  448  10376 0
 10373  10374  10375  448 -10377 0
 10373  10374  10375  448  10378 0

c  -1-1 --> -2
c    ( b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧  b^{8, 56}_0 ∧ -p_448) -> ( b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0)
c  in CNF:
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨  b^{8, 57}_2
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨  b^{8, 57}_1
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨  p_448 ∨ -b^{8, 57}_0
c  in DIMACS:
-10373  10374 -10375  448  10376 0
-10373  10374 -10375  448  10377 0
-10373  10374 -10375  448 -10378 0

c  -2-1 --> break 
c    ( b^{8, 56}_2 ∧  b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨  b^{8, 56}_0 ∨  p_448 ∨ break
c  in DIMACS:
-10373 -10374  10375  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 56}_2 ∧ -b^{8, 56}_1 ∧ -b^{8, 56}_0 ∧ true) 
c  in CNF:
c    -b^{8, 56}_2 ∨  b^{8, 56}_1 ∨  b^{8, 56}_0 ∨ false 
c  in DIMACS:
-10373  10374  10375  0

c  3 does not represent an automaton state.
c    -(-b^{8, 56}_2 ∧  b^{8, 56}_1 ∧  b^{8, 56}_0 ∧ true) 
c  in CNF:
c     b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ false 
c  in DIMACS:
 10373 -10374 -10375  0
c  -3 does not represent an automaton state.
c    -( b^{8, 56}_2 ∧  b^{8, 56}_1 ∧  b^{8, 56}_0 ∧ true) 
c  in CNF:
c    -b^{8, 56}_2 ∨ -b^{8, 56}_1 ∨ -b^{8, 56}_0 ∨ false 
c  in DIMACS:
-10373 -10374 -10375  0

c i = 57
c  -2+1 --> -1
c    ( b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧  p_456) -> ( b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0)
c  in CNF:
c    -b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨  b^{8, 58}_2
c    -b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_1
c    -b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨  b^{8, 58}_0
c  in DIMACS:
-10376 -10377  10378 -456  10379 0
-10376 -10377  10378 -456 -10380 0
-10376 -10377  10378 -456  10381 0

c  -1+1 --> 0
c    ( b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0 ∧  p_456) -> (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧ -b^{8, 58}_0)
c  in CNF:
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_2
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_1
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_0
c  in DIMACS:
-10376  10377 -10378 -456 -10379 0
-10376  10377 -10378 -456 -10380 0
-10376  10377 -10378 -456 -10381 0

c  0+1 --> 1
c    (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧  p_456) -> (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0)
c  in CNF:
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_2
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_1
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨  b^{8, 58}_0
c  in DIMACS:
 10376  10377  10378 -456 -10379 0
 10376  10377  10378 -456 -10380 0
 10376  10377  10378 -456  10381 0

c  1+1 --> 2
c    (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0 ∧  p_456) -> (-b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0)
c  in CNF:
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_2
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨  b^{8, 58}_1
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ -p_456 ∨ -b^{8, 58}_0
c  in DIMACS:
 10376  10377 -10378 -456 -10379 0
 10376  10377 -10378 -456  10380 0
 10376  10377 -10378 -456 -10381 0

c  2+1 --> break 
c    (-b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧  p_456) -> break
c  in CNF:
c     b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 10376 -10377  10378 -456 1162 0


c  2-1 --> 1
c    (-b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧ -p_456) -> (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0)
c  in CNF:
c     b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_2
c     b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_1
c     b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨  b^{8, 58}_0
c  in DIMACS:
 10376 -10377  10378  456 -10379 0
 10376 -10377  10378  456 -10380 0
 10376 -10377  10378  456  10381 0

c  1-1 --> 0
c    (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0 ∧ -p_456) -> (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧ -b^{8, 58}_0)
c  in CNF:
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_2
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_1
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_0
c  in DIMACS:
 10376  10377 -10378  456 -10379 0
 10376  10377 -10378  456 -10380 0
 10376  10377 -10378  456 -10381 0

c  0-1 --> -1
c    (-b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧ -p_456) -> ( b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0)
c  in CNF:
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨  b^{8, 58}_2
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_1
c     b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨  b^{8, 58}_0
c  in DIMACS:
 10376  10377  10378  456  10379 0
 10376  10377  10378  456 -10380 0
 10376  10377  10378  456  10381 0

c  -1-1 --> -2
c    ( b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧  b^{8, 57}_0 ∧ -p_456) -> ( b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0)
c  in CNF:
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨  b^{8, 58}_2
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨  b^{8, 58}_1
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨  p_456 ∨ -b^{8, 58}_0
c  in DIMACS:
-10376  10377 -10378  456  10379 0
-10376  10377 -10378  456  10380 0
-10376  10377 -10378  456 -10381 0

c  -2-1 --> break 
c    ( b^{8, 57}_2 ∧  b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨  b^{8, 57}_0 ∨  p_456 ∨ break
c  in DIMACS:
-10376 -10377  10378  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 57}_2 ∧ -b^{8, 57}_1 ∧ -b^{8, 57}_0 ∧ true) 
c  in CNF:
c    -b^{8, 57}_2 ∨  b^{8, 57}_1 ∨  b^{8, 57}_0 ∨ false 
c  in DIMACS:
-10376  10377  10378  0

c  3 does not represent an automaton state.
c    -(-b^{8, 57}_2 ∧  b^{8, 57}_1 ∧  b^{8, 57}_0 ∧ true) 
c  in CNF:
c     b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ false 
c  in DIMACS:
 10376 -10377 -10378  0
c  -3 does not represent an automaton state.
c    -( b^{8, 57}_2 ∧  b^{8, 57}_1 ∧  b^{8, 57}_0 ∧ true) 
c  in CNF:
c    -b^{8, 57}_2 ∨ -b^{8, 57}_1 ∨ -b^{8, 57}_0 ∨ false 
c  in DIMACS:
-10376 -10377 -10378  0

c i = 58
c  -2+1 --> -1
c    ( b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧  p_464) -> ( b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0)
c  in CNF:
c    -b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨  b^{8, 59}_2
c    -b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_1
c    -b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨  b^{8, 59}_0
c  in DIMACS:
-10379 -10380  10381 -464  10382 0
-10379 -10380  10381 -464 -10383 0
-10379 -10380  10381 -464  10384 0

c  -1+1 --> 0
c    ( b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0 ∧  p_464) -> (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧ -b^{8, 59}_0)
c  in CNF:
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_2
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_1
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_0
c  in DIMACS:
-10379  10380 -10381 -464 -10382 0
-10379  10380 -10381 -464 -10383 0
-10379  10380 -10381 -464 -10384 0

c  0+1 --> 1
c    (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧  p_464) -> (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0)
c  in CNF:
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_2
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_1
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨  b^{8, 59}_0
c  in DIMACS:
 10379  10380  10381 -464 -10382 0
 10379  10380  10381 -464 -10383 0
 10379  10380  10381 -464  10384 0

c  1+1 --> 2
c    (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0 ∧  p_464) -> (-b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0)
c  in CNF:
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_2
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨  b^{8, 59}_1
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ -p_464 ∨ -b^{8, 59}_0
c  in DIMACS:
 10379  10380 -10381 -464 -10382 0
 10379  10380 -10381 -464  10383 0
 10379  10380 -10381 -464 -10384 0

c  2+1 --> break 
c    (-b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧  p_464) -> break
c  in CNF:
c     b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 10379 -10380  10381 -464 1162 0


c  2-1 --> 1
c    (-b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧ -p_464) -> (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0)
c  in CNF:
c     b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_2
c     b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_1
c     b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨  b^{8, 59}_0
c  in DIMACS:
 10379 -10380  10381  464 -10382 0
 10379 -10380  10381  464 -10383 0
 10379 -10380  10381  464  10384 0

c  1-1 --> 0
c    (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0 ∧ -p_464) -> (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧ -b^{8, 59}_0)
c  in CNF:
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_2
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_1
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_0
c  in DIMACS:
 10379  10380 -10381  464 -10382 0
 10379  10380 -10381  464 -10383 0
 10379  10380 -10381  464 -10384 0

c  0-1 --> -1
c    (-b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧ -p_464) -> ( b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0)
c  in CNF:
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨  b^{8, 59}_2
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_1
c     b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨  b^{8, 59}_0
c  in DIMACS:
 10379  10380  10381  464  10382 0
 10379  10380  10381  464 -10383 0
 10379  10380  10381  464  10384 0

c  -1-1 --> -2
c    ( b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧  b^{8, 58}_0 ∧ -p_464) -> ( b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0)
c  in CNF:
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨  b^{8, 59}_2
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨  b^{8, 59}_1
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨  p_464 ∨ -b^{8, 59}_0
c  in DIMACS:
-10379  10380 -10381  464  10382 0
-10379  10380 -10381  464  10383 0
-10379  10380 -10381  464 -10384 0

c  -2-1 --> break 
c    ( b^{8, 58}_2 ∧  b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨  b^{8, 58}_0 ∨  p_464 ∨ break
c  in DIMACS:
-10379 -10380  10381  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 58}_2 ∧ -b^{8, 58}_1 ∧ -b^{8, 58}_0 ∧ true) 
c  in CNF:
c    -b^{8, 58}_2 ∨  b^{8, 58}_1 ∨  b^{8, 58}_0 ∨ false 
c  in DIMACS:
-10379  10380  10381  0

c  3 does not represent an automaton state.
c    -(-b^{8, 58}_2 ∧  b^{8, 58}_1 ∧  b^{8, 58}_0 ∧ true) 
c  in CNF:
c     b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ false 
c  in DIMACS:
 10379 -10380 -10381  0
c  -3 does not represent an automaton state.
c    -( b^{8, 58}_2 ∧  b^{8, 58}_1 ∧  b^{8, 58}_0 ∧ true) 
c  in CNF:
c    -b^{8, 58}_2 ∨ -b^{8, 58}_1 ∨ -b^{8, 58}_0 ∨ false 
c  in DIMACS:
-10379 -10380 -10381  0

c i = 59
c  -2+1 --> -1
c    ( b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧  p_472) -> ( b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0)
c  in CNF:
c    -b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨  b^{8, 60}_2
c    -b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_1
c    -b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨  b^{8, 60}_0
c  in DIMACS:
-10382 -10383  10384 -472  10385 0
-10382 -10383  10384 -472 -10386 0
-10382 -10383  10384 -472  10387 0

c  -1+1 --> 0
c    ( b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0 ∧  p_472) -> (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧ -b^{8, 60}_0)
c  in CNF:
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_2
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_1
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_0
c  in DIMACS:
-10382  10383 -10384 -472 -10385 0
-10382  10383 -10384 -472 -10386 0
-10382  10383 -10384 -472 -10387 0

c  0+1 --> 1
c    (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧  p_472) -> (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0)
c  in CNF:
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_2
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_1
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨  b^{8, 60}_0
c  in DIMACS:
 10382  10383  10384 -472 -10385 0
 10382  10383  10384 -472 -10386 0
 10382  10383  10384 -472  10387 0

c  1+1 --> 2
c    (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0 ∧  p_472) -> (-b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0)
c  in CNF:
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_2
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨  b^{8, 60}_1
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ -p_472 ∨ -b^{8, 60}_0
c  in DIMACS:
 10382  10383 -10384 -472 -10385 0
 10382  10383 -10384 -472  10386 0
 10382  10383 -10384 -472 -10387 0

c  2+1 --> break 
c    (-b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧  p_472) -> break
c  in CNF:
c     b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 10382 -10383  10384 -472 1162 0


c  2-1 --> 1
c    (-b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧ -p_472) -> (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0)
c  in CNF:
c     b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_2
c     b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_1
c     b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨  b^{8, 60}_0
c  in DIMACS:
 10382 -10383  10384  472 -10385 0
 10382 -10383  10384  472 -10386 0
 10382 -10383  10384  472  10387 0

c  1-1 --> 0
c    (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0 ∧ -p_472) -> (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧ -b^{8, 60}_0)
c  in CNF:
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_2
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_1
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_0
c  in DIMACS:
 10382  10383 -10384  472 -10385 0
 10382  10383 -10384  472 -10386 0
 10382  10383 -10384  472 -10387 0

c  0-1 --> -1
c    (-b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧ -p_472) -> ( b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0)
c  in CNF:
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨  b^{8, 60}_2
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_1
c     b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨  b^{8, 60}_0
c  in DIMACS:
 10382  10383  10384  472  10385 0
 10382  10383  10384  472 -10386 0
 10382  10383  10384  472  10387 0

c  -1-1 --> -2
c    ( b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧  b^{8, 59}_0 ∧ -p_472) -> ( b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0)
c  in CNF:
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨  b^{8, 60}_2
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨  b^{8, 60}_1
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨  p_472 ∨ -b^{8, 60}_0
c  in DIMACS:
-10382  10383 -10384  472  10385 0
-10382  10383 -10384  472  10386 0
-10382  10383 -10384  472 -10387 0

c  -2-1 --> break 
c    ( b^{8, 59}_2 ∧  b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨  b^{8, 59}_0 ∨  p_472 ∨ break
c  in DIMACS:
-10382 -10383  10384  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 59}_2 ∧ -b^{8, 59}_1 ∧ -b^{8, 59}_0 ∧ true) 
c  in CNF:
c    -b^{8, 59}_2 ∨  b^{8, 59}_1 ∨  b^{8, 59}_0 ∨ false 
c  in DIMACS:
-10382  10383  10384  0

c  3 does not represent an automaton state.
c    -(-b^{8, 59}_2 ∧  b^{8, 59}_1 ∧  b^{8, 59}_0 ∧ true) 
c  in CNF:
c     b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ false 
c  in DIMACS:
 10382 -10383 -10384  0
c  -3 does not represent an automaton state.
c    -( b^{8, 59}_2 ∧  b^{8, 59}_1 ∧  b^{8, 59}_0 ∧ true) 
c  in CNF:
c    -b^{8, 59}_2 ∨ -b^{8, 59}_1 ∨ -b^{8, 59}_0 ∨ false 
c  in DIMACS:
-10382 -10383 -10384  0

c i = 60
c  -2+1 --> -1
c    ( b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧  p_480) -> ( b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0)
c  in CNF:
c    -b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨  b^{8, 61}_2
c    -b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_1
c    -b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨  b^{8, 61}_0
c  in DIMACS:
-10385 -10386  10387 -480  10388 0
-10385 -10386  10387 -480 -10389 0
-10385 -10386  10387 -480  10390 0

c  -1+1 --> 0
c    ( b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0 ∧  p_480) -> (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧ -b^{8, 61}_0)
c  in CNF:
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_2
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_1
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_0
c  in DIMACS:
-10385  10386 -10387 -480 -10388 0
-10385  10386 -10387 -480 -10389 0
-10385  10386 -10387 -480 -10390 0

c  0+1 --> 1
c    (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧  p_480) -> (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0)
c  in CNF:
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_2
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_1
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨  b^{8, 61}_0
c  in DIMACS:
 10385  10386  10387 -480 -10388 0
 10385  10386  10387 -480 -10389 0
 10385  10386  10387 -480  10390 0

c  1+1 --> 2
c    (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0 ∧  p_480) -> (-b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0)
c  in CNF:
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_2
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨  b^{8, 61}_1
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ -p_480 ∨ -b^{8, 61}_0
c  in DIMACS:
 10385  10386 -10387 -480 -10388 0
 10385  10386 -10387 -480  10389 0
 10385  10386 -10387 -480 -10390 0

c  2+1 --> break 
c    (-b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧  p_480) -> break
c  in CNF:
c     b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 10385 -10386  10387 -480 1162 0


c  2-1 --> 1
c    (-b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧ -p_480) -> (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0)
c  in CNF:
c     b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_2
c     b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_1
c     b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨  b^{8, 61}_0
c  in DIMACS:
 10385 -10386  10387  480 -10388 0
 10385 -10386  10387  480 -10389 0
 10385 -10386  10387  480  10390 0

c  1-1 --> 0
c    (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0 ∧ -p_480) -> (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧ -b^{8, 61}_0)
c  in CNF:
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_2
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_1
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_0
c  in DIMACS:
 10385  10386 -10387  480 -10388 0
 10385  10386 -10387  480 -10389 0
 10385  10386 -10387  480 -10390 0

c  0-1 --> -1
c    (-b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧ -p_480) -> ( b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0)
c  in CNF:
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨  b^{8, 61}_2
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_1
c     b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨  b^{8, 61}_0
c  in DIMACS:
 10385  10386  10387  480  10388 0
 10385  10386  10387  480 -10389 0
 10385  10386  10387  480  10390 0

c  -1-1 --> -2
c    ( b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧  b^{8, 60}_0 ∧ -p_480) -> ( b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0)
c  in CNF:
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨  b^{8, 61}_2
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨  b^{8, 61}_1
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨  p_480 ∨ -b^{8, 61}_0
c  in DIMACS:
-10385  10386 -10387  480  10388 0
-10385  10386 -10387  480  10389 0
-10385  10386 -10387  480 -10390 0

c  -2-1 --> break 
c    ( b^{8, 60}_2 ∧  b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨  b^{8, 60}_0 ∨  p_480 ∨ break
c  in DIMACS:
-10385 -10386  10387  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 60}_2 ∧ -b^{8, 60}_1 ∧ -b^{8, 60}_0 ∧ true) 
c  in CNF:
c    -b^{8, 60}_2 ∨  b^{8, 60}_1 ∨  b^{8, 60}_0 ∨ false 
c  in DIMACS:
-10385  10386  10387  0

c  3 does not represent an automaton state.
c    -(-b^{8, 60}_2 ∧  b^{8, 60}_1 ∧  b^{8, 60}_0 ∧ true) 
c  in CNF:
c     b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ false 
c  in DIMACS:
 10385 -10386 -10387  0
c  -3 does not represent an automaton state.
c    -( b^{8, 60}_2 ∧  b^{8, 60}_1 ∧  b^{8, 60}_0 ∧ true) 
c  in CNF:
c    -b^{8, 60}_2 ∨ -b^{8, 60}_1 ∨ -b^{8, 60}_0 ∨ false 
c  in DIMACS:
-10385 -10386 -10387  0

c i = 61
c  -2+1 --> -1
c    ( b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧  p_488) -> ( b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0)
c  in CNF:
c    -b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨  b^{8, 62}_2
c    -b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_1
c    -b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨  b^{8, 62}_0
c  in DIMACS:
-10388 -10389  10390 -488  10391 0
-10388 -10389  10390 -488 -10392 0
-10388 -10389  10390 -488  10393 0

c  -1+1 --> 0
c    ( b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0 ∧  p_488) -> (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧ -b^{8, 62}_0)
c  in CNF:
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_2
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_1
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_0
c  in DIMACS:
-10388  10389 -10390 -488 -10391 0
-10388  10389 -10390 -488 -10392 0
-10388  10389 -10390 -488 -10393 0

c  0+1 --> 1
c    (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧  p_488) -> (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0)
c  in CNF:
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_2
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_1
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨  b^{8, 62}_0
c  in DIMACS:
 10388  10389  10390 -488 -10391 0
 10388  10389  10390 -488 -10392 0
 10388  10389  10390 -488  10393 0

c  1+1 --> 2
c    (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0 ∧  p_488) -> (-b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0)
c  in CNF:
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_2
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨  b^{8, 62}_1
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ -p_488 ∨ -b^{8, 62}_0
c  in DIMACS:
 10388  10389 -10390 -488 -10391 0
 10388  10389 -10390 -488  10392 0
 10388  10389 -10390 -488 -10393 0

c  2+1 --> break 
c    (-b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧  p_488) -> break
c  in CNF:
c     b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 10388 -10389  10390 -488 1162 0


c  2-1 --> 1
c    (-b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧ -p_488) -> (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0)
c  in CNF:
c     b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_2
c     b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_1
c     b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨  b^{8, 62}_0
c  in DIMACS:
 10388 -10389  10390  488 -10391 0
 10388 -10389  10390  488 -10392 0
 10388 -10389  10390  488  10393 0

c  1-1 --> 0
c    (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0 ∧ -p_488) -> (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧ -b^{8, 62}_0)
c  in CNF:
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_2
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_1
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_0
c  in DIMACS:
 10388  10389 -10390  488 -10391 0
 10388  10389 -10390  488 -10392 0
 10388  10389 -10390  488 -10393 0

c  0-1 --> -1
c    (-b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧ -p_488) -> ( b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0)
c  in CNF:
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨  b^{8, 62}_2
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_1
c     b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨  b^{8, 62}_0
c  in DIMACS:
 10388  10389  10390  488  10391 0
 10388  10389  10390  488 -10392 0
 10388  10389  10390  488  10393 0

c  -1-1 --> -2
c    ( b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧  b^{8, 61}_0 ∧ -p_488) -> ( b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0)
c  in CNF:
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨  b^{8, 62}_2
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨  b^{8, 62}_1
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨  p_488 ∨ -b^{8, 62}_0
c  in DIMACS:
-10388  10389 -10390  488  10391 0
-10388  10389 -10390  488  10392 0
-10388  10389 -10390  488 -10393 0

c  -2-1 --> break 
c    ( b^{8, 61}_2 ∧  b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨  b^{8, 61}_0 ∨  p_488 ∨ break
c  in DIMACS:
-10388 -10389  10390  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 61}_2 ∧ -b^{8, 61}_1 ∧ -b^{8, 61}_0 ∧ true) 
c  in CNF:
c    -b^{8, 61}_2 ∨  b^{8, 61}_1 ∨  b^{8, 61}_0 ∨ false 
c  in DIMACS:
-10388  10389  10390  0

c  3 does not represent an automaton state.
c    -(-b^{8, 61}_2 ∧  b^{8, 61}_1 ∧  b^{8, 61}_0 ∧ true) 
c  in CNF:
c     b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ false 
c  in DIMACS:
 10388 -10389 -10390  0
c  -3 does not represent an automaton state.
c    -( b^{8, 61}_2 ∧  b^{8, 61}_1 ∧  b^{8, 61}_0 ∧ true) 
c  in CNF:
c    -b^{8, 61}_2 ∨ -b^{8, 61}_1 ∨ -b^{8, 61}_0 ∨ false 
c  in DIMACS:
-10388 -10389 -10390  0

c i = 62
c  -2+1 --> -1
c    ( b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧  p_496) -> ( b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0)
c  in CNF:
c    -b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨  b^{8, 63}_2
c    -b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_1
c    -b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨  b^{8, 63}_0
c  in DIMACS:
-10391 -10392  10393 -496  10394 0
-10391 -10392  10393 -496 -10395 0
-10391 -10392  10393 -496  10396 0

c  -1+1 --> 0
c    ( b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0 ∧  p_496) -> (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧ -b^{8, 63}_0)
c  in CNF:
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_2
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_1
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_0
c  in DIMACS:
-10391  10392 -10393 -496 -10394 0
-10391  10392 -10393 -496 -10395 0
-10391  10392 -10393 -496 -10396 0

c  0+1 --> 1
c    (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧  p_496) -> (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0)
c  in CNF:
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_2
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_1
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨  b^{8, 63}_0
c  in DIMACS:
 10391  10392  10393 -496 -10394 0
 10391  10392  10393 -496 -10395 0
 10391  10392  10393 -496  10396 0

c  1+1 --> 2
c    (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0 ∧  p_496) -> (-b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0)
c  in CNF:
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_2
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨  b^{8, 63}_1
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ -p_496 ∨ -b^{8, 63}_0
c  in DIMACS:
 10391  10392 -10393 -496 -10394 0
 10391  10392 -10393 -496  10395 0
 10391  10392 -10393 -496 -10396 0

c  2+1 --> break 
c    (-b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧  p_496) -> break
c  in CNF:
c     b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 10391 -10392  10393 -496 1162 0


c  2-1 --> 1
c    (-b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧ -p_496) -> (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0)
c  in CNF:
c     b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_2
c     b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_1
c     b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨  b^{8, 63}_0
c  in DIMACS:
 10391 -10392  10393  496 -10394 0
 10391 -10392  10393  496 -10395 0
 10391 -10392  10393  496  10396 0

c  1-1 --> 0
c    (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0 ∧ -p_496) -> (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧ -b^{8, 63}_0)
c  in CNF:
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_2
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_1
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_0
c  in DIMACS:
 10391  10392 -10393  496 -10394 0
 10391  10392 -10393  496 -10395 0
 10391  10392 -10393  496 -10396 0

c  0-1 --> -1
c    (-b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧ -p_496) -> ( b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0)
c  in CNF:
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨  b^{8, 63}_2
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_1
c     b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨  b^{8, 63}_0
c  in DIMACS:
 10391  10392  10393  496  10394 0
 10391  10392  10393  496 -10395 0
 10391  10392  10393  496  10396 0

c  -1-1 --> -2
c    ( b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧  b^{8, 62}_0 ∧ -p_496) -> ( b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0)
c  in CNF:
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨  b^{8, 63}_2
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨  b^{8, 63}_1
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨  p_496 ∨ -b^{8, 63}_0
c  in DIMACS:
-10391  10392 -10393  496  10394 0
-10391  10392 -10393  496  10395 0
-10391  10392 -10393  496 -10396 0

c  -2-1 --> break 
c    ( b^{8, 62}_2 ∧  b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨  b^{8, 62}_0 ∨  p_496 ∨ break
c  in DIMACS:
-10391 -10392  10393  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 62}_2 ∧ -b^{8, 62}_1 ∧ -b^{8, 62}_0 ∧ true) 
c  in CNF:
c    -b^{8, 62}_2 ∨  b^{8, 62}_1 ∨  b^{8, 62}_0 ∨ false 
c  in DIMACS:
-10391  10392  10393  0

c  3 does not represent an automaton state.
c    -(-b^{8, 62}_2 ∧  b^{8, 62}_1 ∧  b^{8, 62}_0 ∧ true) 
c  in CNF:
c     b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ false 
c  in DIMACS:
 10391 -10392 -10393  0
c  -3 does not represent an automaton state.
c    -( b^{8, 62}_2 ∧  b^{8, 62}_1 ∧  b^{8, 62}_0 ∧ true) 
c  in CNF:
c    -b^{8, 62}_2 ∨ -b^{8, 62}_1 ∨ -b^{8, 62}_0 ∨ false 
c  in DIMACS:
-10391 -10392 -10393  0

c i = 63
c  -2+1 --> -1
c    ( b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧  p_504) -> ( b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0)
c  in CNF:
c    -b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨  b^{8, 64}_2
c    -b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_1
c    -b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨  b^{8, 64}_0
c  in DIMACS:
-10394 -10395  10396 -504  10397 0
-10394 -10395  10396 -504 -10398 0
-10394 -10395  10396 -504  10399 0

c  -1+1 --> 0
c    ( b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0 ∧  p_504) -> (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧ -b^{8, 64}_0)
c  in CNF:
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_2
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_1
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_0
c  in DIMACS:
-10394  10395 -10396 -504 -10397 0
-10394  10395 -10396 -504 -10398 0
-10394  10395 -10396 -504 -10399 0

c  0+1 --> 1
c    (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧  p_504) -> (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0)
c  in CNF:
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_2
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_1
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨  b^{8, 64}_0
c  in DIMACS:
 10394  10395  10396 -504 -10397 0
 10394  10395  10396 -504 -10398 0
 10394  10395  10396 -504  10399 0

c  1+1 --> 2
c    (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0 ∧  p_504) -> (-b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0)
c  in CNF:
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_2
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨  b^{8, 64}_1
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ -p_504 ∨ -b^{8, 64}_0
c  in DIMACS:
 10394  10395 -10396 -504 -10397 0
 10394  10395 -10396 -504  10398 0
 10394  10395 -10396 -504 -10399 0

c  2+1 --> break 
c    (-b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧  p_504) -> break
c  in CNF:
c     b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 10394 -10395  10396 -504 1162 0


c  2-1 --> 1
c    (-b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧ -p_504) -> (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0)
c  in CNF:
c     b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_2
c     b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_1
c     b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨  b^{8, 64}_0
c  in DIMACS:
 10394 -10395  10396  504 -10397 0
 10394 -10395  10396  504 -10398 0
 10394 -10395  10396  504  10399 0

c  1-1 --> 0
c    (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0 ∧ -p_504) -> (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧ -b^{8, 64}_0)
c  in CNF:
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_2
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_1
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_0
c  in DIMACS:
 10394  10395 -10396  504 -10397 0
 10394  10395 -10396  504 -10398 0
 10394  10395 -10396  504 -10399 0

c  0-1 --> -1
c    (-b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧ -p_504) -> ( b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0)
c  in CNF:
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨  b^{8, 64}_2
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_1
c     b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨  b^{8, 64}_0
c  in DIMACS:
 10394  10395  10396  504  10397 0
 10394  10395  10396  504 -10398 0
 10394  10395  10396  504  10399 0

c  -1-1 --> -2
c    ( b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧  b^{8, 63}_0 ∧ -p_504) -> ( b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0)
c  in CNF:
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨  b^{8, 64}_2
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨  b^{8, 64}_1
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨  p_504 ∨ -b^{8, 64}_0
c  in DIMACS:
-10394  10395 -10396  504  10397 0
-10394  10395 -10396  504  10398 0
-10394  10395 -10396  504 -10399 0

c  -2-1 --> break 
c    ( b^{8, 63}_2 ∧  b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨  b^{8, 63}_0 ∨  p_504 ∨ break
c  in DIMACS:
-10394 -10395  10396  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 63}_2 ∧ -b^{8, 63}_1 ∧ -b^{8, 63}_0 ∧ true) 
c  in CNF:
c    -b^{8, 63}_2 ∨  b^{8, 63}_1 ∨  b^{8, 63}_0 ∨ false 
c  in DIMACS:
-10394  10395  10396  0

c  3 does not represent an automaton state.
c    -(-b^{8, 63}_2 ∧  b^{8, 63}_1 ∧  b^{8, 63}_0 ∧ true) 
c  in CNF:
c     b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ false 
c  in DIMACS:
 10394 -10395 -10396  0
c  -3 does not represent an automaton state.
c    -( b^{8, 63}_2 ∧  b^{8, 63}_1 ∧  b^{8, 63}_0 ∧ true) 
c  in CNF:
c    -b^{8, 63}_2 ∨ -b^{8, 63}_1 ∨ -b^{8, 63}_0 ∨ false 
c  in DIMACS:
-10394 -10395 -10396  0

c i = 64
c  -2+1 --> -1
c    ( b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧  p_512) -> ( b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0)
c  in CNF:
c    -b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨  b^{8, 65}_2
c    -b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_1
c    -b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨  b^{8, 65}_0
c  in DIMACS:
-10397 -10398  10399 -512  10400 0
-10397 -10398  10399 -512 -10401 0
-10397 -10398  10399 -512  10402 0

c  -1+1 --> 0
c    ( b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0 ∧  p_512) -> (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧ -b^{8, 65}_0)
c  in CNF:
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_2
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_1
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_0
c  in DIMACS:
-10397  10398 -10399 -512 -10400 0
-10397  10398 -10399 -512 -10401 0
-10397  10398 -10399 -512 -10402 0

c  0+1 --> 1
c    (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧  p_512) -> (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0)
c  in CNF:
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_2
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_1
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨  b^{8, 65}_0
c  in DIMACS:
 10397  10398  10399 -512 -10400 0
 10397  10398  10399 -512 -10401 0
 10397  10398  10399 -512  10402 0

c  1+1 --> 2
c    (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0 ∧  p_512) -> (-b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0)
c  in CNF:
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_2
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨  b^{8, 65}_1
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ -p_512 ∨ -b^{8, 65}_0
c  in DIMACS:
 10397  10398 -10399 -512 -10400 0
 10397  10398 -10399 -512  10401 0
 10397  10398 -10399 -512 -10402 0

c  2+1 --> break 
c    (-b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧  p_512) -> break
c  in CNF:
c     b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 10397 -10398  10399 -512 1162 0


c  2-1 --> 1
c    (-b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧ -p_512) -> (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0)
c  in CNF:
c     b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_2
c     b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_1
c     b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨  b^{8, 65}_0
c  in DIMACS:
 10397 -10398  10399  512 -10400 0
 10397 -10398  10399  512 -10401 0
 10397 -10398  10399  512  10402 0

c  1-1 --> 0
c    (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0 ∧ -p_512) -> (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧ -b^{8, 65}_0)
c  in CNF:
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_2
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_1
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_0
c  in DIMACS:
 10397  10398 -10399  512 -10400 0
 10397  10398 -10399  512 -10401 0
 10397  10398 -10399  512 -10402 0

c  0-1 --> -1
c    (-b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧ -p_512) -> ( b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0)
c  in CNF:
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨  b^{8, 65}_2
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_1
c     b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨  b^{8, 65}_0
c  in DIMACS:
 10397  10398  10399  512  10400 0
 10397  10398  10399  512 -10401 0
 10397  10398  10399  512  10402 0

c  -1-1 --> -2
c    ( b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧  b^{8, 64}_0 ∧ -p_512) -> ( b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0)
c  in CNF:
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨  b^{8, 65}_2
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨  b^{8, 65}_1
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨  p_512 ∨ -b^{8, 65}_0
c  in DIMACS:
-10397  10398 -10399  512  10400 0
-10397  10398 -10399  512  10401 0
-10397  10398 -10399  512 -10402 0

c  -2-1 --> break 
c    ( b^{8, 64}_2 ∧  b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨  b^{8, 64}_0 ∨  p_512 ∨ break
c  in DIMACS:
-10397 -10398  10399  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 64}_2 ∧ -b^{8, 64}_1 ∧ -b^{8, 64}_0 ∧ true) 
c  in CNF:
c    -b^{8, 64}_2 ∨  b^{8, 64}_1 ∨  b^{8, 64}_0 ∨ false 
c  in DIMACS:
-10397  10398  10399  0

c  3 does not represent an automaton state.
c    -(-b^{8, 64}_2 ∧  b^{8, 64}_1 ∧  b^{8, 64}_0 ∧ true) 
c  in CNF:
c     b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ false 
c  in DIMACS:
 10397 -10398 -10399  0
c  -3 does not represent an automaton state.
c    -( b^{8, 64}_2 ∧  b^{8, 64}_1 ∧  b^{8, 64}_0 ∧ true) 
c  in CNF:
c    -b^{8, 64}_2 ∨ -b^{8, 64}_1 ∨ -b^{8, 64}_0 ∨ false 
c  in DIMACS:
-10397 -10398 -10399  0

c i = 65
c  -2+1 --> -1
c    ( b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧  p_520) -> ( b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0)
c  in CNF:
c    -b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨  b^{8, 66}_2
c    -b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_1
c    -b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨  b^{8, 66}_0
c  in DIMACS:
-10400 -10401  10402 -520  10403 0
-10400 -10401  10402 -520 -10404 0
-10400 -10401  10402 -520  10405 0

c  -1+1 --> 0
c    ( b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0 ∧  p_520) -> (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧ -b^{8, 66}_0)
c  in CNF:
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_2
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_1
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_0
c  in DIMACS:
-10400  10401 -10402 -520 -10403 0
-10400  10401 -10402 -520 -10404 0
-10400  10401 -10402 -520 -10405 0

c  0+1 --> 1
c    (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧  p_520) -> (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0)
c  in CNF:
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_2
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_1
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨  b^{8, 66}_0
c  in DIMACS:
 10400  10401  10402 -520 -10403 0
 10400  10401  10402 -520 -10404 0
 10400  10401  10402 -520  10405 0

c  1+1 --> 2
c    (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0 ∧  p_520) -> (-b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0)
c  in CNF:
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_2
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨  b^{8, 66}_1
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ -p_520 ∨ -b^{8, 66}_0
c  in DIMACS:
 10400  10401 -10402 -520 -10403 0
 10400  10401 -10402 -520  10404 0
 10400  10401 -10402 -520 -10405 0

c  2+1 --> break 
c    (-b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧  p_520) -> break
c  in CNF:
c     b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 10400 -10401  10402 -520 1162 0


c  2-1 --> 1
c    (-b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧ -p_520) -> (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0)
c  in CNF:
c     b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_2
c     b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_1
c     b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨  b^{8, 66}_0
c  in DIMACS:
 10400 -10401  10402  520 -10403 0
 10400 -10401  10402  520 -10404 0
 10400 -10401  10402  520  10405 0

c  1-1 --> 0
c    (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0 ∧ -p_520) -> (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧ -b^{8, 66}_0)
c  in CNF:
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_2
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_1
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_0
c  in DIMACS:
 10400  10401 -10402  520 -10403 0
 10400  10401 -10402  520 -10404 0
 10400  10401 -10402  520 -10405 0

c  0-1 --> -1
c    (-b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧ -p_520) -> ( b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0)
c  in CNF:
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨  b^{8, 66}_2
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_1
c     b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨  b^{8, 66}_0
c  in DIMACS:
 10400  10401  10402  520  10403 0
 10400  10401  10402  520 -10404 0
 10400  10401  10402  520  10405 0

c  -1-1 --> -2
c    ( b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧  b^{8, 65}_0 ∧ -p_520) -> ( b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0)
c  in CNF:
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨  b^{8, 66}_2
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨  b^{8, 66}_1
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨  p_520 ∨ -b^{8, 66}_0
c  in DIMACS:
-10400  10401 -10402  520  10403 0
-10400  10401 -10402  520  10404 0
-10400  10401 -10402  520 -10405 0

c  -2-1 --> break 
c    ( b^{8, 65}_2 ∧  b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨  b^{8, 65}_0 ∨  p_520 ∨ break
c  in DIMACS:
-10400 -10401  10402  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 65}_2 ∧ -b^{8, 65}_1 ∧ -b^{8, 65}_0 ∧ true) 
c  in CNF:
c    -b^{8, 65}_2 ∨  b^{8, 65}_1 ∨  b^{8, 65}_0 ∨ false 
c  in DIMACS:
-10400  10401  10402  0

c  3 does not represent an automaton state.
c    -(-b^{8, 65}_2 ∧  b^{8, 65}_1 ∧  b^{8, 65}_0 ∧ true) 
c  in CNF:
c     b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ false 
c  in DIMACS:
 10400 -10401 -10402  0
c  -3 does not represent an automaton state.
c    -( b^{8, 65}_2 ∧  b^{8, 65}_1 ∧  b^{8, 65}_0 ∧ true) 
c  in CNF:
c    -b^{8, 65}_2 ∨ -b^{8, 65}_1 ∨ -b^{8, 65}_0 ∨ false 
c  in DIMACS:
-10400 -10401 -10402  0

c i = 66
c  -2+1 --> -1
c    ( b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧  p_528) -> ( b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0)
c  in CNF:
c    -b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨  b^{8, 67}_2
c    -b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_1
c    -b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨  b^{8, 67}_0
c  in DIMACS:
-10403 -10404  10405 -528  10406 0
-10403 -10404  10405 -528 -10407 0
-10403 -10404  10405 -528  10408 0

c  -1+1 --> 0
c    ( b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0 ∧  p_528) -> (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧ -b^{8, 67}_0)
c  in CNF:
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_2
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_1
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_0
c  in DIMACS:
-10403  10404 -10405 -528 -10406 0
-10403  10404 -10405 -528 -10407 0
-10403  10404 -10405 -528 -10408 0

c  0+1 --> 1
c    (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧  p_528) -> (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0)
c  in CNF:
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_2
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_1
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨  b^{8, 67}_0
c  in DIMACS:
 10403  10404  10405 -528 -10406 0
 10403  10404  10405 -528 -10407 0
 10403  10404  10405 -528  10408 0

c  1+1 --> 2
c    (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0 ∧  p_528) -> (-b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0)
c  in CNF:
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_2
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨  b^{8, 67}_1
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ -p_528 ∨ -b^{8, 67}_0
c  in DIMACS:
 10403  10404 -10405 -528 -10406 0
 10403  10404 -10405 -528  10407 0
 10403  10404 -10405 -528 -10408 0

c  2+1 --> break 
c    (-b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧  p_528) -> break
c  in CNF:
c     b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 10403 -10404  10405 -528 1162 0


c  2-1 --> 1
c    (-b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧ -p_528) -> (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0)
c  in CNF:
c     b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_2
c     b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_1
c     b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨  b^{8, 67}_0
c  in DIMACS:
 10403 -10404  10405  528 -10406 0
 10403 -10404  10405  528 -10407 0
 10403 -10404  10405  528  10408 0

c  1-1 --> 0
c    (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0 ∧ -p_528) -> (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧ -b^{8, 67}_0)
c  in CNF:
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_2
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_1
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_0
c  in DIMACS:
 10403  10404 -10405  528 -10406 0
 10403  10404 -10405  528 -10407 0
 10403  10404 -10405  528 -10408 0

c  0-1 --> -1
c    (-b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧ -p_528) -> ( b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0)
c  in CNF:
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨  b^{8, 67}_2
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_1
c     b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨  b^{8, 67}_0
c  in DIMACS:
 10403  10404  10405  528  10406 0
 10403  10404  10405  528 -10407 0
 10403  10404  10405  528  10408 0

c  -1-1 --> -2
c    ( b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧  b^{8, 66}_0 ∧ -p_528) -> ( b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0)
c  in CNF:
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨  b^{8, 67}_2
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨  b^{8, 67}_1
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨  p_528 ∨ -b^{8, 67}_0
c  in DIMACS:
-10403  10404 -10405  528  10406 0
-10403  10404 -10405  528  10407 0
-10403  10404 -10405  528 -10408 0

c  -2-1 --> break 
c    ( b^{8, 66}_2 ∧  b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨  b^{8, 66}_0 ∨  p_528 ∨ break
c  in DIMACS:
-10403 -10404  10405  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 66}_2 ∧ -b^{8, 66}_1 ∧ -b^{8, 66}_0 ∧ true) 
c  in CNF:
c    -b^{8, 66}_2 ∨  b^{8, 66}_1 ∨  b^{8, 66}_0 ∨ false 
c  in DIMACS:
-10403  10404  10405  0

c  3 does not represent an automaton state.
c    -(-b^{8, 66}_2 ∧  b^{8, 66}_1 ∧  b^{8, 66}_0 ∧ true) 
c  in CNF:
c     b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ false 
c  in DIMACS:
 10403 -10404 -10405  0
c  -3 does not represent an automaton state.
c    -( b^{8, 66}_2 ∧  b^{8, 66}_1 ∧  b^{8, 66}_0 ∧ true) 
c  in CNF:
c    -b^{8, 66}_2 ∨ -b^{8, 66}_1 ∨ -b^{8, 66}_0 ∨ false 
c  in DIMACS:
-10403 -10404 -10405  0

c i = 67
c  -2+1 --> -1
c    ( b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧  p_536) -> ( b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0)
c  in CNF:
c    -b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨  b^{8, 68}_2
c    -b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_1
c    -b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨  b^{8, 68}_0
c  in DIMACS:
-10406 -10407  10408 -536  10409 0
-10406 -10407  10408 -536 -10410 0
-10406 -10407  10408 -536  10411 0

c  -1+1 --> 0
c    ( b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0 ∧  p_536) -> (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧ -b^{8, 68}_0)
c  in CNF:
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_2
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_1
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_0
c  in DIMACS:
-10406  10407 -10408 -536 -10409 0
-10406  10407 -10408 -536 -10410 0
-10406  10407 -10408 -536 -10411 0

c  0+1 --> 1
c    (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧  p_536) -> (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0)
c  in CNF:
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_2
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_1
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨  b^{8, 68}_0
c  in DIMACS:
 10406  10407  10408 -536 -10409 0
 10406  10407  10408 -536 -10410 0
 10406  10407  10408 -536  10411 0

c  1+1 --> 2
c    (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0 ∧  p_536) -> (-b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0)
c  in CNF:
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_2
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨  b^{8, 68}_1
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ -p_536 ∨ -b^{8, 68}_0
c  in DIMACS:
 10406  10407 -10408 -536 -10409 0
 10406  10407 -10408 -536  10410 0
 10406  10407 -10408 -536 -10411 0

c  2+1 --> break 
c    (-b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧  p_536) -> break
c  in CNF:
c     b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 10406 -10407  10408 -536 1162 0


c  2-1 --> 1
c    (-b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧ -p_536) -> (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0)
c  in CNF:
c     b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_2
c     b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_1
c     b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨  b^{8, 68}_0
c  in DIMACS:
 10406 -10407  10408  536 -10409 0
 10406 -10407  10408  536 -10410 0
 10406 -10407  10408  536  10411 0

c  1-1 --> 0
c    (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0 ∧ -p_536) -> (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧ -b^{8, 68}_0)
c  in CNF:
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_2
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_1
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_0
c  in DIMACS:
 10406  10407 -10408  536 -10409 0
 10406  10407 -10408  536 -10410 0
 10406  10407 -10408  536 -10411 0

c  0-1 --> -1
c    (-b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧ -p_536) -> ( b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0)
c  in CNF:
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨  b^{8, 68}_2
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_1
c     b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨  b^{8, 68}_0
c  in DIMACS:
 10406  10407  10408  536  10409 0
 10406  10407  10408  536 -10410 0
 10406  10407  10408  536  10411 0

c  -1-1 --> -2
c    ( b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧  b^{8, 67}_0 ∧ -p_536) -> ( b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0)
c  in CNF:
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨  b^{8, 68}_2
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨  b^{8, 68}_1
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨  p_536 ∨ -b^{8, 68}_0
c  in DIMACS:
-10406  10407 -10408  536  10409 0
-10406  10407 -10408  536  10410 0
-10406  10407 -10408  536 -10411 0

c  -2-1 --> break 
c    ( b^{8, 67}_2 ∧  b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨  b^{8, 67}_0 ∨  p_536 ∨ break
c  in DIMACS:
-10406 -10407  10408  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 67}_2 ∧ -b^{8, 67}_1 ∧ -b^{8, 67}_0 ∧ true) 
c  in CNF:
c    -b^{8, 67}_2 ∨  b^{8, 67}_1 ∨  b^{8, 67}_0 ∨ false 
c  in DIMACS:
-10406  10407  10408  0

c  3 does not represent an automaton state.
c    -(-b^{8, 67}_2 ∧  b^{8, 67}_1 ∧  b^{8, 67}_0 ∧ true) 
c  in CNF:
c     b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ false 
c  in DIMACS:
 10406 -10407 -10408  0
c  -3 does not represent an automaton state.
c    -( b^{8, 67}_2 ∧  b^{8, 67}_1 ∧  b^{8, 67}_0 ∧ true) 
c  in CNF:
c    -b^{8, 67}_2 ∨ -b^{8, 67}_1 ∨ -b^{8, 67}_0 ∨ false 
c  in DIMACS:
-10406 -10407 -10408  0

c i = 68
c  -2+1 --> -1
c    ( b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧  p_544) -> ( b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0)
c  in CNF:
c    -b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨  b^{8, 69}_2
c    -b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_1
c    -b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨  b^{8, 69}_0
c  in DIMACS:
-10409 -10410  10411 -544  10412 0
-10409 -10410  10411 -544 -10413 0
-10409 -10410  10411 -544  10414 0

c  -1+1 --> 0
c    ( b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0 ∧  p_544) -> (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧ -b^{8, 69}_0)
c  in CNF:
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_2
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_1
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_0
c  in DIMACS:
-10409  10410 -10411 -544 -10412 0
-10409  10410 -10411 -544 -10413 0
-10409  10410 -10411 -544 -10414 0

c  0+1 --> 1
c    (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧  p_544) -> (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0)
c  in CNF:
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_2
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_1
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨  b^{8, 69}_0
c  in DIMACS:
 10409  10410  10411 -544 -10412 0
 10409  10410  10411 -544 -10413 0
 10409  10410  10411 -544  10414 0

c  1+1 --> 2
c    (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0 ∧  p_544) -> (-b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0)
c  in CNF:
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_2
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨  b^{8, 69}_1
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ -p_544 ∨ -b^{8, 69}_0
c  in DIMACS:
 10409  10410 -10411 -544 -10412 0
 10409  10410 -10411 -544  10413 0
 10409  10410 -10411 -544 -10414 0

c  2+1 --> break 
c    (-b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧  p_544) -> break
c  in CNF:
c     b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 10409 -10410  10411 -544 1162 0


c  2-1 --> 1
c    (-b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧ -p_544) -> (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0)
c  in CNF:
c     b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_2
c     b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_1
c     b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨  b^{8, 69}_0
c  in DIMACS:
 10409 -10410  10411  544 -10412 0
 10409 -10410  10411  544 -10413 0
 10409 -10410  10411  544  10414 0

c  1-1 --> 0
c    (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0 ∧ -p_544) -> (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧ -b^{8, 69}_0)
c  in CNF:
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_2
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_1
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_0
c  in DIMACS:
 10409  10410 -10411  544 -10412 0
 10409  10410 -10411  544 -10413 0
 10409  10410 -10411  544 -10414 0

c  0-1 --> -1
c    (-b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧ -p_544) -> ( b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0)
c  in CNF:
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨  b^{8, 69}_2
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_1
c     b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨  b^{8, 69}_0
c  in DIMACS:
 10409  10410  10411  544  10412 0
 10409  10410  10411  544 -10413 0
 10409  10410  10411  544  10414 0

c  -1-1 --> -2
c    ( b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧  b^{8, 68}_0 ∧ -p_544) -> ( b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0)
c  in CNF:
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨  b^{8, 69}_2
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨  b^{8, 69}_1
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨  p_544 ∨ -b^{8, 69}_0
c  in DIMACS:
-10409  10410 -10411  544  10412 0
-10409  10410 -10411  544  10413 0
-10409  10410 -10411  544 -10414 0

c  -2-1 --> break 
c    ( b^{8, 68}_2 ∧  b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨  b^{8, 68}_0 ∨  p_544 ∨ break
c  in DIMACS:
-10409 -10410  10411  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 68}_2 ∧ -b^{8, 68}_1 ∧ -b^{8, 68}_0 ∧ true) 
c  in CNF:
c    -b^{8, 68}_2 ∨  b^{8, 68}_1 ∨  b^{8, 68}_0 ∨ false 
c  in DIMACS:
-10409  10410  10411  0

c  3 does not represent an automaton state.
c    -(-b^{8, 68}_2 ∧  b^{8, 68}_1 ∧  b^{8, 68}_0 ∧ true) 
c  in CNF:
c     b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ false 
c  in DIMACS:
 10409 -10410 -10411  0
c  -3 does not represent an automaton state.
c    -( b^{8, 68}_2 ∧  b^{8, 68}_1 ∧  b^{8, 68}_0 ∧ true) 
c  in CNF:
c    -b^{8, 68}_2 ∨ -b^{8, 68}_1 ∨ -b^{8, 68}_0 ∨ false 
c  in DIMACS:
-10409 -10410 -10411  0

c i = 69
c  -2+1 --> -1
c    ( b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧  p_552) -> ( b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0)
c  in CNF:
c    -b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨  b^{8, 70}_2
c    -b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_1
c    -b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨  b^{8, 70}_0
c  in DIMACS:
-10412 -10413  10414 -552  10415 0
-10412 -10413  10414 -552 -10416 0
-10412 -10413  10414 -552  10417 0

c  -1+1 --> 0
c    ( b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0 ∧  p_552) -> (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧ -b^{8, 70}_0)
c  in CNF:
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_2
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_1
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_0
c  in DIMACS:
-10412  10413 -10414 -552 -10415 0
-10412  10413 -10414 -552 -10416 0
-10412  10413 -10414 -552 -10417 0

c  0+1 --> 1
c    (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧  p_552) -> (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0)
c  in CNF:
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_2
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_1
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨  b^{8, 70}_0
c  in DIMACS:
 10412  10413  10414 -552 -10415 0
 10412  10413  10414 -552 -10416 0
 10412  10413  10414 -552  10417 0

c  1+1 --> 2
c    (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0 ∧  p_552) -> (-b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0)
c  in CNF:
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_2
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨  b^{8, 70}_1
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ -p_552 ∨ -b^{8, 70}_0
c  in DIMACS:
 10412  10413 -10414 -552 -10415 0
 10412  10413 -10414 -552  10416 0
 10412  10413 -10414 -552 -10417 0

c  2+1 --> break 
c    (-b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧  p_552) -> break
c  in CNF:
c     b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 10412 -10413  10414 -552 1162 0


c  2-1 --> 1
c    (-b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧ -p_552) -> (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0)
c  in CNF:
c     b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_2
c     b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_1
c     b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨  b^{8, 70}_0
c  in DIMACS:
 10412 -10413  10414  552 -10415 0
 10412 -10413  10414  552 -10416 0
 10412 -10413  10414  552  10417 0

c  1-1 --> 0
c    (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0 ∧ -p_552) -> (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧ -b^{8, 70}_0)
c  in CNF:
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_2
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_1
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_0
c  in DIMACS:
 10412  10413 -10414  552 -10415 0
 10412  10413 -10414  552 -10416 0
 10412  10413 -10414  552 -10417 0

c  0-1 --> -1
c    (-b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧ -p_552) -> ( b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0)
c  in CNF:
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨  b^{8, 70}_2
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_1
c     b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨  b^{8, 70}_0
c  in DIMACS:
 10412  10413  10414  552  10415 0
 10412  10413  10414  552 -10416 0
 10412  10413  10414  552  10417 0

c  -1-1 --> -2
c    ( b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧  b^{8, 69}_0 ∧ -p_552) -> ( b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0)
c  in CNF:
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨  b^{8, 70}_2
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨  b^{8, 70}_1
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨  p_552 ∨ -b^{8, 70}_0
c  in DIMACS:
-10412  10413 -10414  552  10415 0
-10412  10413 -10414  552  10416 0
-10412  10413 -10414  552 -10417 0

c  -2-1 --> break 
c    ( b^{8, 69}_2 ∧  b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨  b^{8, 69}_0 ∨  p_552 ∨ break
c  in DIMACS:
-10412 -10413  10414  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 69}_2 ∧ -b^{8, 69}_1 ∧ -b^{8, 69}_0 ∧ true) 
c  in CNF:
c    -b^{8, 69}_2 ∨  b^{8, 69}_1 ∨  b^{8, 69}_0 ∨ false 
c  in DIMACS:
-10412  10413  10414  0

c  3 does not represent an automaton state.
c    -(-b^{8, 69}_2 ∧  b^{8, 69}_1 ∧  b^{8, 69}_0 ∧ true) 
c  in CNF:
c     b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ false 
c  in DIMACS:
 10412 -10413 -10414  0
c  -3 does not represent an automaton state.
c    -( b^{8, 69}_2 ∧  b^{8, 69}_1 ∧  b^{8, 69}_0 ∧ true) 
c  in CNF:
c    -b^{8, 69}_2 ∨ -b^{8, 69}_1 ∨ -b^{8, 69}_0 ∨ false 
c  in DIMACS:
-10412 -10413 -10414  0

c i = 70
c  -2+1 --> -1
c    ( b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧  p_560) -> ( b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0)
c  in CNF:
c    -b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨  b^{8, 71}_2
c    -b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_1
c    -b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨  b^{8, 71}_0
c  in DIMACS:
-10415 -10416  10417 -560  10418 0
-10415 -10416  10417 -560 -10419 0
-10415 -10416  10417 -560  10420 0

c  -1+1 --> 0
c    ( b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0 ∧  p_560) -> (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧ -b^{8, 71}_0)
c  in CNF:
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_2
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_1
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_0
c  in DIMACS:
-10415  10416 -10417 -560 -10418 0
-10415  10416 -10417 -560 -10419 0
-10415  10416 -10417 -560 -10420 0

c  0+1 --> 1
c    (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧  p_560) -> (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0)
c  in CNF:
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_2
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_1
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨  b^{8, 71}_0
c  in DIMACS:
 10415  10416  10417 -560 -10418 0
 10415  10416  10417 -560 -10419 0
 10415  10416  10417 -560  10420 0

c  1+1 --> 2
c    (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0 ∧  p_560) -> (-b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0)
c  in CNF:
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_2
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨  b^{8, 71}_1
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ -p_560 ∨ -b^{8, 71}_0
c  in DIMACS:
 10415  10416 -10417 -560 -10418 0
 10415  10416 -10417 -560  10419 0
 10415  10416 -10417 -560 -10420 0

c  2+1 --> break 
c    (-b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧  p_560) -> break
c  in CNF:
c     b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 10415 -10416  10417 -560 1162 0


c  2-1 --> 1
c    (-b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧ -p_560) -> (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0)
c  in CNF:
c     b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_2
c     b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_1
c     b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨  b^{8, 71}_0
c  in DIMACS:
 10415 -10416  10417  560 -10418 0
 10415 -10416  10417  560 -10419 0
 10415 -10416  10417  560  10420 0

c  1-1 --> 0
c    (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0 ∧ -p_560) -> (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧ -b^{8, 71}_0)
c  in CNF:
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_2
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_1
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_0
c  in DIMACS:
 10415  10416 -10417  560 -10418 0
 10415  10416 -10417  560 -10419 0
 10415  10416 -10417  560 -10420 0

c  0-1 --> -1
c    (-b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧ -p_560) -> ( b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0)
c  in CNF:
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨  b^{8, 71}_2
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_1
c     b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨  b^{8, 71}_0
c  in DIMACS:
 10415  10416  10417  560  10418 0
 10415  10416  10417  560 -10419 0
 10415  10416  10417  560  10420 0

c  -1-1 --> -2
c    ( b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧  b^{8, 70}_0 ∧ -p_560) -> ( b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0)
c  in CNF:
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨  b^{8, 71}_2
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨  b^{8, 71}_1
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨  p_560 ∨ -b^{8, 71}_0
c  in DIMACS:
-10415  10416 -10417  560  10418 0
-10415  10416 -10417  560  10419 0
-10415  10416 -10417  560 -10420 0

c  -2-1 --> break 
c    ( b^{8, 70}_2 ∧  b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨  b^{8, 70}_0 ∨  p_560 ∨ break
c  in DIMACS:
-10415 -10416  10417  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 70}_2 ∧ -b^{8, 70}_1 ∧ -b^{8, 70}_0 ∧ true) 
c  in CNF:
c    -b^{8, 70}_2 ∨  b^{8, 70}_1 ∨  b^{8, 70}_0 ∨ false 
c  in DIMACS:
-10415  10416  10417  0

c  3 does not represent an automaton state.
c    -(-b^{8, 70}_2 ∧  b^{8, 70}_1 ∧  b^{8, 70}_0 ∧ true) 
c  in CNF:
c     b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ false 
c  in DIMACS:
 10415 -10416 -10417  0
c  -3 does not represent an automaton state.
c    -( b^{8, 70}_2 ∧  b^{8, 70}_1 ∧  b^{8, 70}_0 ∧ true) 
c  in CNF:
c    -b^{8, 70}_2 ∨ -b^{8, 70}_1 ∨ -b^{8, 70}_0 ∨ false 
c  in DIMACS:
-10415 -10416 -10417  0

c i = 71
c  -2+1 --> -1
c    ( b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧  p_568) -> ( b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0)
c  in CNF:
c    -b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨  b^{8, 72}_2
c    -b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_1
c    -b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨  b^{8, 72}_0
c  in DIMACS:
-10418 -10419  10420 -568  10421 0
-10418 -10419  10420 -568 -10422 0
-10418 -10419  10420 -568  10423 0

c  -1+1 --> 0
c    ( b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0 ∧  p_568) -> (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧ -b^{8, 72}_0)
c  in CNF:
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_2
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_1
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_0
c  in DIMACS:
-10418  10419 -10420 -568 -10421 0
-10418  10419 -10420 -568 -10422 0
-10418  10419 -10420 -568 -10423 0

c  0+1 --> 1
c    (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧  p_568) -> (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0)
c  in CNF:
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_2
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_1
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨  b^{8, 72}_0
c  in DIMACS:
 10418  10419  10420 -568 -10421 0
 10418  10419  10420 -568 -10422 0
 10418  10419  10420 -568  10423 0

c  1+1 --> 2
c    (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0 ∧  p_568) -> (-b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0)
c  in CNF:
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_2
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨  b^{8, 72}_1
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ -p_568 ∨ -b^{8, 72}_0
c  in DIMACS:
 10418  10419 -10420 -568 -10421 0
 10418  10419 -10420 -568  10422 0
 10418  10419 -10420 -568 -10423 0

c  2+1 --> break 
c    (-b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧  p_568) -> break
c  in CNF:
c     b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 10418 -10419  10420 -568 1162 0


c  2-1 --> 1
c    (-b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧ -p_568) -> (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0)
c  in CNF:
c     b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_2
c     b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_1
c     b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨  b^{8, 72}_0
c  in DIMACS:
 10418 -10419  10420  568 -10421 0
 10418 -10419  10420  568 -10422 0
 10418 -10419  10420  568  10423 0

c  1-1 --> 0
c    (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0 ∧ -p_568) -> (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧ -b^{8, 72}_0)
c  in CNF:
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_2
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_1
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_0
c  in DIMACS:
 10418  10419 -10420  568 -10421 0
 10418  10419 -10420  568 -10422 0
 10418  10419 -10420  568 -10423 0

c  0-1 --> -1
c    (-b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧ -p_568) -> ( b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0)
c  in CNF:
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨  b^{8, 72}_2
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_1
c     b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨  b^{8, 72}_0
c  in DIMACS:
 10418  10419  10420  568  10421 0
 10418  10419  10420  568 -10422 0
 10418  10419  10420  568  10423 0

c  -1-1 --> -2
c    ( b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧  b^{8, 71}_0 ∧ -p_568) -> ( b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0)
c  in CNF:
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨  b^{8, 72}_2
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨  b^{8, 72}_1
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨  p_568 ∨ -b^{8, 72}_0
c  in DIMACS:
-10418  10419 -10420  568  10421 0
-10418  10419 -10420  568  10422 0
-10418  10419 -10420  568 -10423 0

c  -2-1 --> break 
c    ( b^{8, 71}_2 ∧  b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨  b^{8, 71}_0 ∨  p_568 ∨ break
c  in DIMACS:
-10418 -10419  10420  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 71}_2 ∧ -b^{8, 71}_1 ∧ -b^{8, 71}_0 ∧ true) 
c  in CNF:
c    -b^{8, 71}_2 ∨  b^{8, 71}_1 ∨  b^{8, 71}_0 ∨ false 
c  in DIMACS:
-10418  10419  10420  0

c  3 does not represent an automaton state.
c    -(-b^{8, 71}_2 ∧  b^{8, 71}_1 ∧  b^{8, 71}_0 ∧ true) 
c  in CNF:
c     b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ false 
c  in DIMACS:
 10418 -10419 -10420  0
c  -3 does not represent an automaton state.
c    -( b^{8, 71}_2 ∧  b^{8, 71}_1 ∧  b^{8, 71}_0 ∧ true) 
c  in CNF:
c    -b^{8, 71}_2 ∨ -b^{8, 71}_1 ∨ -b^{8, 71}_0 ∨ false 
c  in DIMACS:
-10418 -10419 -10420  0

c i = 72
c  -2+1 --> -1
c    ( b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧  p_576) -> ( b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0)
c  in CNF:
c    -b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨  b^{8, 73}_2
c    -b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_1
c    -b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨  b^{8, 73}_0
c  in DIMACS:
-10421 -10422  10423 -576  10424 0
-10421 -10422  10423 -576 -10425 0
-10421 -10422  10423 -576  10426 0

c  -1+1 --> 0
c    ( b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0 ∧  p_576) -> (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧ -b^{8, 73}_0)
c  in CNF:
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_2
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_1
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_0
c  in DIMACS:
-10421  10422 -10423 -576 -10424 0
-10421  10422 -10423 -576 -10425 0
-10421  10422 -10423 -576 -10426 0

c  0+1 --> 1
c    (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧  p_576) -> (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0)
c  in CNF:
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_2
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_1
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨  b^{8, 73}_0
c  in DIMACS:
 10421  10422  10423 -576 -10424 0
 10421  10422  10423 -576 -10425 0
 10421  10422  10423 -576  10426 0

c  1+1 --> 2
c    (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0 ∧  p_576) -> (-b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0)
c  in CNF:
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_2
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨  b^{8, 73}_1
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ -p_576 ∨ -b^{8, 73}_0
c  in DIMACS:
 10421  10422 -10423 -576 -10424 0
 10421  10422 -10423 -576  10425 0
 10421  10422 -10423 -576 -10426 0

c  2+1 --> break 
c    (-b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧  p_576) -> break
c  in CNF:
c     b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 10421 -10422  10423 -576 1162 0


c  2-1 --> 1
c    (-b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧ -p_576) -> (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0)
c  in CNF:
c     b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_2
c     b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_1
c     b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨  b^{8, 73}_0
c  in DIMACS:
 10421 -10422  10423  576 -10424 0
 10421 -10422  10423  576 -10425 0
 10421 -10422  10423  576  10426 0

c  1-1 --> 0
c    (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0 ∧ -p_576) -> (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧ -b^{8, 73}_0)
c  in CNF:
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_2
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_1
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_0
c  in DIMACS:
 10421  10422 -10423  576 -10424 0
 10421  10422 -10423  576 -10425 0
 10421  10422 -10423  576 -10426 0

c  0-1 --> -1
c    (-b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧ -p_576) -> ( b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0)
c  in CNF:
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨  b^{8, 73}_2
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_1
c     b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨  b^{8, 73}_0
c  in DIMACS:
 10421  10422  10423  576  10424 0
 10421  10422  10423  576 -10425 0
 10421  10422  10423  576  10426 0

c  -1-1 --> -2
c    ( b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧  b^{8, 72}_0 ∧ -p_576) -> ( b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0)
c  in CNF:
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨  b^{8, 73}_2
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨  b^{8, 73}_1
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨  p_576 ∨ -b^{8, 73}_0
c  in DIMACS:
-10421  10422 -10423  576  10424 0
-10421  10422 -10423  576  10425 0
-10421  10422 -10423  576 -10426 0

c  -2-1 --> break 
c    ( b^{8, 72}_2 ∧  b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨  b^{8, 72}_0 ∨  p_576 ∨ break
c  in DIMACS:
-10421 -10422  10423  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 72}_2 ∧ -b^{8, 72}_1 ∧ -b^{8, 72}_0 ∧ true) 
c  in CNF:
c    -b^{8, 72}_2 ∨  b^{8, 72}_1 ∨  b^{8, 72}_0 ∨ false 
c  in DIMACS:
-10421  10422  10423  0

c  3 does not represent an automaton state.
c    -(-b^{8, 72}_2 ∧  b^{8, 72}_1 ∧  b^{8, 72}_0 ∧ true) 
c  in CNF:
c     b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ false 
c  in DIMACS:
 10421 -10422 -10423  0
c  -3 does not represent an automaton state.
c    -( b^{8, 72}_2 ∧  b^{8, 72}_1 ∧  b^{8, 72}_0 ∧ true) 
c  in CNF:
c    -b^{8, 72}_2 ∨ -b^{8, 72}_1 ∨ -b^{8, 72}_0 ∨ false 
c  in DIMACS:
-10421 -10422 -10423  0

c i = 73
c  -2+1 --> -1
c    ( b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧  p_584) -> ( b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0)
c  in CNF:
c    -b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨  b^{8, 74}_2
c    -b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_1
c    -b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨  b^{8, 74}_0
c  in DIMACS:
-10424 -10425  10426 -584  10427 0
-10424 -10425  10426 -584 -10428 0
-10424 -10425  10426 -584  10429 0

c  -1+1 --> 0
c    ( b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0 ∧  p_584) -> (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧ -b^{8, 74}_0)
c  in CNF:
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_2
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_1
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_0
c  in DIMACS:
-10424  10425 -10426 -584 -10427 0
-10424  10425 -10426 -584 -10428 0
-10424  10425 -10426 -584 -10429 0

c  0+1 --> 1
c    (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧  p_584) -> (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0)
c  in CNF:
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_2
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_1
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨  b^{8, 74}_0
c  in DIMACS:
 10424  10425  10426 -584 -10427 0
 10424  10425  10426 -584 -10428 0
 10424  10425  10426 -584  10429 0

c  1+1 --> 2
c    (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0 ∧  p_584) -> (-b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0)
c  in CNF:
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_2
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨  b^{8, 74}_1
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ -p_584 ∨ -b^{8, 74}_0
c  in DIMACS:
 10424  10425 -10426 -584 -10427 0
 10424  10425 -10426 -584  10428 0
 10424  10425 -10426 -584 -10429 0

c  2+1 --> break 
c    (-b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧  p_584) -> break
c  in CNF:
c     b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 10424 -10425  10426 -584 1162 0


c  2-1 --> 1
c    (-b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧ -p_584) -> (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0)
c  in CNF:
c     b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_2
c     b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_1
c     b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨  b^{8, 74}_0
c  in DIMACS:
 10424 -10425  10426  584 -10427 0
 10424 -10425  10426  584 -10428 0
 10424 -10425  10426  584  10429 0

c  1-1 --> 0
c    (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0 ∧ -p_584) -> (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧ -b^{8, 74}_0)
c  in CNF:
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_2
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_1
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_0
c  in DIMACS:
 10424  10425 -10426  584 -10427 0
 10424  10425 -10426  584 -10428 0
 10424  10425 -10426  584 -10429 0

c  0-1 --> -1
c    (-b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧ -p_584) -> ( b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0)
c  in CNF:
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨  b^{8, 74}_2
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_1
c     b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨  b^{8, 74}_0
c  in DIMACS:
 10424  10425  10426  584  10427 0
 10424  10425  10426  584 -10428 0
 10424  10425  10426  584  10429 0

c  -1-1 --> -2
c    ( b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧  b^{8, 73}_0 ∧ -p_584) -> ( b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0)
c  in CNF:
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨  b^{8, 74}_2
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨  b^{8, 74}_1
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨  p_584 ∨ -b^{8, 74}_0
c  in DIMACS:
-10424  10425 -10426  584  10427 0
-10424  10425 -10426  584  10428 0
-10424  10425 -10426  584 -10429 0

c  -2-1 --> break 
c    ( b^{8, 73}_2 ∧  b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨  b^{8, 73}_0 ∨  p_584 ∨ break
c  in DIMACS:
-10424 -10425  10426  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 73}_2 ∧ -b^{8, 73}_1 ∧ -b^{8, 73}_0 ∧ true) 
c  in CNF:
c    -b^{8, 73}_2 ∨  b^{8, 73}_1 ∨  b^{8, 73}_0 ∨ false 
c  in DIMACS:
-10424  10425  10426  0

c  3 does not represent an automaton state.
c    -(-b^{8, 73}_2 ∧  b^{8, 73}_1 ∧  b^{8, 73}_0 ∧ true) 
c  in CNF:
c     b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ false 
c  in DIMACS:
 10424 -10425 -10426  0
c  -3 does not represent an automaton state.
c    -( b^{8, 73}_2 ∧  b^{8, 73}_1 ∧  b^{8, 73}_0 ∧ true) 
c  in CNF:
c    -b^{8, 73}_2 ∨ -b^{8, 73}_1 ∨ -b^{8, 73}_0 ∨ false 
c  in DIMACS:
-10424 -10425 -10426  0

c i = 74
c  -2+1 --> -1
c    ( b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧  p_592) -> ( b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0)
c  in CNF:
c    -b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨  b^{8, 75}_2
c    -b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_1
c    -b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨  b^{8, 75}_0
c  in DIMACS:
-10427 -10428  10429 -592  10430 0
-10427 -10428  10429 -592 -10431 0
-10427 -10428  10429 -592  10432 0

c  -1+1 --> 0
c    ( b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0 ∧  p_592) -> (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧ -b^{8, 75}_0)
c  in CNF:
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_2
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_1
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_0
c  in DIMACS:
-10427  10428 -10429 -592 -10430 0
-10427  10428 -10429 -592 -10431 0
-10427  10428 -10429 -592 -10432 0

c  0+1 --> 1
c    (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧  p_592) -> (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0)
c  in CNF:
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_2
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_1
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨  b^{8, 75}_0
c  in DIMACS:
 10427  10428  10429 -592 -10430 0
 10427  10428  10429 -592 -10431 0
 10427  10428  10429 -592  10432 0

c  1+1 --> 2
c    (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0 ∧  p_592) -> (-b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0)
c  in CNF:
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_2
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨  b^{8, 75}_1
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ -p_592 ∨ -b^{8, 75}_0
c  in DIMACS:
 10427  10428 -10429 -592 -10430 0
 10427  10428 -10429 -592  10431 0
 10427  10428 -10429 -592 -10432 0

c  2+1 --> break 
c    (-b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧  p_592) -> break
c  in CNF:
c     b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 10427 -10428  10429 -592 1162 0


c  2-1 --> 1
c    (-b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧ -p_592) -> (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0)
c  in CNF:
c     b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_2
c     b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_1
c     b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨  b^{8, 75}_0
c  in DIMACS:
 10427 -10428  10429  592 -10430 0
 10427 -10428  10429  592 -10431 0
 10427 -10428  10429  592  10432 0

c  1-1 --> 0
c    (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0 ∧ -p_592) -> (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧ -b^{8, 75}_0)
c  in CNF:
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_2
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_1
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_0
c  in DIMACS:
 10427  10428 -10429  592 -10430 0
 10427  10428 -10429  592 -10431 0
 10427  10428 -10429  592 -10432 0

c  0-1 --> -1
c    (-b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧ -p_592) -> ( b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0)
c  in CNF:
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨  b^{8, 75}_2
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_1
c     b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨  b^{8, 75}_0
c  in DIMACS:
 10427  10428  10429  592  10430 0
 10427  10428  10429  592 -10431 0
 10427  10428  10429  592  10432 0

c  -1-1 --> -2
c    ( b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧  b^{8, 74}_0 ∧ -p_592) -> ( b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0)
c  in CNF:
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨  b^{8, 75}_2
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨  b^{8, 75}_1
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨  p_592 ∨ -b^{8, 75}_0
c  in DIMACS:
-10427  10428 -10429  592  10430 0
-10427  10428 -10429  592  10431 0
-10427  10428 -10429  592 -10432 0

c  -2-1 --> break 
c    ( b^{8, 74}_2 ∧  b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨  b^{8, 74}_0 ∨  p_592 ∨ break
c  in DIMACS:
-10427 -10428  10429  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 74}_2 ∧ -b^{8, 74}_1 ∧ -b^{8, 74}_0 ∧ true) 
c  in CNF:
c    -b^{8, 74}_2 ∨  b^{8, 74}_1 ∨  b^{8, 74}_0 ∨ false 
c  in DIMACS:
-10427  10428  10429  0

c  3 does not represent an automaton state.
c    -(-b^{8, 74}_2 ∧  b^{8, 74}_1 ∧  b^{8, 74}_0 ∧ true) 
c  in CNF:
c     b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ false 
c  in DIMACS:
 10427 -10428 -10429  0
c  -3 does not represent an automaton state.
c    -( b^{8, 74}_2 ∧  b^{8, 74}_1 ∧  b^{8, 74}_0 ∧ true) 
c  in CNF:
c    -b^{8, 74}_2 ∨ -b^{8, 74}_1 ∨ -b^{8, 74}_0 ∨ false 
c  in DIMACS:
-10427 -10428 -10429  0

c i = 75
c  -2+1 --> -1
c    ( b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧  p_600) -> ( b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0)
c  in CNF:
c    -b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨  b^{8, 76}_2
c    -b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_1
c    -b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨  b^{8, 76}_0
c  in DIMACS:
-10430 -10431  10432 -600  10433 0
-10430 -10431  10432 -600 -10434 0
-10430 -10431  10432 -600  10435 0

c  -1+1 --> 0
c    ( b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0 ∧  p_600) -> (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧ -b^{8, 76}_0)
c  in CNF:
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_2
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_1
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_0
c  in DIMACS:
-10430  10431 -10432 -600 -10433 0
-10430  10431 -10432 -600 -10434 0
-10430  10431 -10432 -600 -10435 0

c  0+1 --> 1
c    (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧  p_600) -> (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0)
c  in CNF:
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_2
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_1
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨  b^{8, 76}_0
c  in DIMACS:
 10430  10431  10432 -600 -10433 0
 10430  10431  10432 -600 -10434 0
 10430  10431  10432 -600  10435 0

c  1+1 --> 2
c    (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0 ∧  p_600) -> (-b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0)
c  in CNF:
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_2
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨  b^{8, 76}_1
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ -p_600 ∨ -b^{8, 76}_0
c  in DIMACS:
 10430  10431 -10432 -600 -10433 0
 10430  10431 -10432 -600  10434 0
 10430  10431 -10432 -600 -10435 0

c  2+1 --> break 
c    (-b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧  p_600) -> break
c  in CNF:
c     b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 10430 -10431  10432 -600 1162 0


c  2-1 --> 1
c    (-b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧ -p_600) -> (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0)
c  in CNF:
c     b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_2
c     b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_1
c     b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨  b^{8, 76}_0
c  in DIMACS:
 10430 -10431  10432  600 -10433 0
 10430 -10431  10432  600 -10434 0
 10430 -10431  10432  600  10435 0

c  1-1 --> 0
c    (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0 ∧ -p_600) -> (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧ -b^{8, 76}_0)
c  in CNF:
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_2
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_1
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_0
c  in DIMACS:
 10430  10431 -10432  600 -10433 0
 10430  10431 -10432  600 -10434 0
 10430  10431 -10432  600 -10435 0

c  0-1 --> -1
c    (-b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧ -p_600) -> ( b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0)
c  in CNF:
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨  b^{8, 76}_2
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_1
c     b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨  b^{8, 76}_0
c  in DIMACS:
 10430  10431  10432  600  10433 0
 10430  10431  10432  600 -10434 0
 10430  10431  10432  600  10435 0

c  -1-1 --> -2
c    ( b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧  b^{8, 75}_0 ∧ -p_600) -> ( b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0)
c  in CNF:
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨  b^{8, 76}_2
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨  b^{8, 76}_1
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨  p_600 ∨ -b^{8, 76}_0
c  in DIMACS:
-10430  10431 -10432  600  10433 0
-10430  10431 -10432  600  10434 0
-10430  10431 -10432  600 -10435 0

c  -2-1 --> break 
c    ( b^{8, 75}_2 ∧  b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨  b^{8, 75}_0 ∨  p_600 ∨ break
c  in DIMACS:
-10430 -10431  10432  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 75}_2 ∧ -b^{8, 75}_1 ∧ -b^{8, 75}_0 ∧ true) 
c  in CNF:
c    -b^{8, 75}_2 ∨  b^{8, 75}_1 ∨  b^{8, 75}_0 ∨ false 
c  in DIMACS:
-10430  10431  10432  0

c  3 does not represent an automaton state.
c    -(-b^{8, 75}_2 ∧  b^{8, 75}_1 ∧  b^{8, 75}_0 ∧ true) 
c  in CNF:
c     b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ false 
c  in DIMACS:
 10430 -10431 -10432  0
c  -3 does not represent an automaton state.
c    -( b^{8, 75}_2 ∧  b^{8, 75}_1 ∧  b^{8, 75}_0 ∧ true) 
c  in CNF:
c    -b^{8, 75}_2 ∨ -b^{8, 75}_1 ∨ -b^{8, 75}_0 ∨ false 
c  in DIMACS:
-10430 -10431 -10432  0

c i = 76
c  -2+1 --> -1
c    ( b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧  p_608) -> ( b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0)
c  in CNF:
c    -b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨  b^{8, 77}_2
c    -b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_1
c    -b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨  b^{8, 77}_0
c  in DIMACS:
-10433 -10434  10435 -608  10436 0
-10433 -10434  10435 -608 -10437 0
-10433 -10434  10435 -608  10438 0

c  -1+1 --> 0
c    ( b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0 ∧  p_608) -> (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧ -b^{8, 77}_0)
c  in CNF:
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_2
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_1
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_0
c  in DIMACS:
-10433  10434 -10435 -608 -10436 0
-10433  10434 -10435 -608 -10437 0
-10433  10434 -10435 -608 -10438 0

c  0+1 --> 1
c    (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧  p_608) -> (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0)
c  in CNF:
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_2
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_1
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨  b^{8, 77}_0
c  in DIMACS:
 10433  10434  10435 -608 -10436 0
 10433  10434  10435 -608 -10437 0
 10433  10434  10435 -608  10438 0

c  1+1 --> 2
c    (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0 ∧  p_608) -> (-b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0)
c  in CNF:
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_2
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨  b^{8, 77}_1
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ -p_608 ∨ -b^{8, 77}_0
c  in DIMACS:
 10433  10434 -10435 -608 -10436 0
 10433  10434 -10435 -608  10437 0
 10433  10434 -10435 -608 -10438 0

c  2+1 --> break 
c    (-b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧  p_608) -> break
c  in CNF:
c     b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 10433 -10434  10435 -608 1162 0


c  2-1 --> 1
c    (-b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧ -p_608) -> (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0)
c  in CNF:
c     b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_2
c     b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_1
c     b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨  b^{8, 77}_0
c  in DIMACS:
 10433 -10434  10435  608 -10436 0
 10433 -10434  10435  608 -10437 0
 10433 -10434  10435  608  10438 0

c  1-1 --> 0
c    (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0 ∧ -p_608) -> (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧ -b^{8, 77}_0)
c  in CNF:
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_2
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_1
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_0
c  in DIMACS:
 10433  10434 -10435  608 -10436 0
 10433  10434 -10435  608 -10437 0
 10433  10434 -10435  608 -10438 0

c  0-1 --> -1
c    (-b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧ -p_608) -> ( b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0)
c  in CNF:
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨  b^{8, 77}_2
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_1
c     b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨  b^{8, 77}_0
c  in DIMACS:
 10433  10434  10435  608  10436 0
 10433  10434  10435  608 -10437 0
 10433  10434  10435  608  10438 0

c  -1-1 --> -2
c    ( b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧  b^{8, 76}_0 ∧ -p_608) -> ( b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0)
c  in CNF:
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨  b^{8, 77}_2
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨  b^{8, 77}_1
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨  p_608 ∨ -b^{8, 77}_0
c  in DIMACS:
-10433  10434 -10435  608  10436 0
-10433  10434 -10435  608  10437 0
-10433  10434 -10435  608 -10438 0

c  -2-1 --> break 
c    ( b^{8, 76}_2 ∧  b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨  b^{8, 76}_0 ∨  p_608 ∨ break
c  in DIMACS:
-10433 -10434  10435  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 76}_2 ∧ -b^{8, 76}_1 ∧ -b^{8, 76}_0 ∧ true) 
c  in CNF:
c    -b^{8, 76}_2 ∨  b^{8, 76}_1 ∨  b^{8, 76}_0 ∨ false 
c  in DIMACS:
-10433  10434  10435  0

c  3 does not represent an automaton state.
c    -(-b^{8, 76}_2 ∧  b^{8, 76}_1 ∧  b^{8, 76}_0 ∧ true) 
c  in CNF:
c     b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ false 
c  in DIMACS:
 10433 -10434 -10435  0
c  -3 does not represent an automaton state.
c    -( b^{8, 76}_2 ∧  b^{8, 76}_1 ∧  b^{8, 76}_0 ∧ true) 
c  in CNF:
c    -b^{8, 76}_2 ∨ -b^{8, 76}_1 ∨ -b^{8, 76}_0 ∨ false 
c  in DIMACS:
-10433 -10434 -10435  0

c i = 77
c  -2+1 --> -1
c    ( b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧  p_616) -> ( b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0)
c  in CNF:
c    -b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨  b^{8, 78}_2
c    -b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_1
c    -b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨  b^{8, 78}_0
c  in DIMACS:
-10436 -10437  10438 -616  10439 0
-10436 -10437  10438 -616 -10440 0
-10436 -10437  10438 -616  10441 0

c  -1+1 --> 0
c    ( b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0 ∧  p_616) -> (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧ -b^{8, 78}_0)
c  in CNF:
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_2
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_1
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_0
c  in DIMACS:
-10436  10437 -10438 -616 -10439 0
-10436  10437 -10438 -616 -10440 0
-10436  10437 -10438 -616 -10441 0

c  0+1 --> 1
c    (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧  p_616) -> (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0)
c  in CNF:
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_2
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_1
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨  b^{8, 78}_0
c  in DIMACS:
 10436  10437  10438 -616 -10439 0
 10436  10437  10438 -616 -10440 0
 10436  10437  10438 -616  10441 0

c  1+1 --> 2
c    (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0 ∧  p_616) -> (-b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0)
c  in CNF:
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_2
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨  b^{8, 78}_1
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ -p_616 ∨ -b^{8, 78}_0
c  in DIMACS:
 10436  10437 -10438 -616 -10439 0
 10436  10437 -10438 -616  10440 0
 10436  10437 -10438 -616 -10441 0

c  2+1 --> break 
c    (-b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧  p_616) -> break
c  in CNF:
c     b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 10436 -10437  10438 -616 1162 0


c  2-1 --> 1
c    (-b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧ -p_616) -> (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0)
c  in CNF:
c     b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_2
c     b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_1
c     b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨  b^{8, 78}_0
c  in DIMACS:
 10436 -10437  10438  616 -10439 0
 10436 -10437  10438  616 -10440 0
 10436 -10437  10438  616  10441 0

c  1-1 --> 0
c    (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0 ∧ -p_616) -> (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧ -b^{8, 78}_0)
c  in CNF:
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_2
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_1
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_0
c  in DIMACS:
 10436  10437 -10438  616 -10439 0
 10436  10437 -10438  616 -10440 0
 10436  10437 -10438  616 -10441 0

c  0-1 --> -1
c    (-b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧ -p_616) -> ( b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0)
c  in CNF:
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨  b^{8, 78}_2
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_1
c     b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨  b^{8, 78}_0
c  in DIMACS:
 10436  10437  10438  616  10439 0
 10436  10437  10438  616 -10440 0
 10436  10437  10438  616  10441 0

c  -1-1 --> -2
c    ( b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧  b^{8, 77}_0 ∧ -p_616) -> ( b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0)
c  in CNF:
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨  b^{8, 78}_2
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨  b^{8, 78}_1
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨  p_616 ∨ -b^{8, 78}_0
c  in DIMACS:
-10436  10437 -10438  616  10439 0
-10436  10437 -10438  616  10440 0
-10436  10437 -10438  616 -10441 0

c  -2-1 --> break 
c    ( b^{8, 77}_2 ∧  b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨  b^{8, 77}_0 ∨  p_616 ∨ break
c  in DIMACS:
-10436 -10437  10438  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 77}_2 ∧ -b^{8, 77}_1 ∧ -b^{8, 77}_0 ∧ true) 
c  in CNF:
c    -b^{8, 77}_2 ∨  b^{8, 77}_1 ∨  b^{8, 77}_0 ∨ false 
c  in DIMACS:
-10436  10437  10438  0

c  3 does not represent an automaton state.
c    -(-b^{8, 77}_2 ∧  b^{8, 77}_1 ∧  b^{8, 77}_0 ∧ true) 
c  in CNF:
c     b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ false 
c  in DIMACS:
 10436 -10437 -10438  0
c  -3 does not represent an automaton state.
c    -( b^{8, 77}_2 ∧  b^{8, 77}_1 ∧  b^{8, 77}_0 ∧ true) 
c  in CNF:
c    -b^{8, 77}_2 ∨ -b^{8, 77}_1 ∨ -b^{8, 77}_0 ∨ false 
c  in DIMACS:
-10436 -10437 -10438  0

c i = 78
c  -2+1 --> -1
c    ( b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧  p_624) -> ( b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0)
c  in CNF:
c    -b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨  b^{8, 79}_2
c    -b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_1
c    -b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨  b^{8, 79}_0
c  in DIMACS:
-10439 -10440  10441 -624  10442 0
-10439 -10440  10441 -624 -10443 0
-10439 -10440  10441 -624  10444 0

c  -1+1 --> 0
c    ( b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0 ∧  p_624) -> (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧ -b^{8, 79}_0)
c  in CNF:
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_2
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_1
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_0
c  in DIMACS:
-10439  10440 -10441 -624 -10442 0
-10439  10440 -10441 -624 -10443 0
-10439  10440 -10441 -624 -10444 0

c  0+1 --> 1
c    (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧  p_624) -> (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0)
c  in CNF:
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_2
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_1
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨  b^{8, 79}_0
c  in DIMACS:
 10439  10440  10441 -624 -10442 0
 10439  10440  10441 -624 -10443 0
 10439  10440  10441 -624  10444 0

c  1+1 --> 2
c    (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0 ∧  p_624) -> (-b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0)
c  in CNF:
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_2
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨  b^{8, 79}_1
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ -p_624 ∨ -b^{8, 79}_0
c  in DIMACS:
 10439  10440 -10441 -624 -10442 0
 10439  10440 -10441 -624  10443 0
 10439  10440 -10441 -624 -10444 0

c  2+1 --> break 
c    (-b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧  p_624) -> break
c  in CNF:
c     b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 10439 -10440  10441 -624 1162 0


c  2-1 --> 1
c    (-b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧ -p_624) -> (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0)
c  in CNF:
c     b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_2
c     b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_1
c     b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨  b^{8, 79}_0
c  in DIMACS:
 10439 -10440  10441  624 -10442 0
 10439 -10440  10441  624 -10443 0
 10439 -10440  10441  624  10444 0

c  1-1 --> 0
c    (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0 ∧ -p_624) -> (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧ -b^{8, 79}_0)
c  in CNF:
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_2
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_1
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_0
c  in DIMACS:
 10439  10440 -10441  624 -10442 0
 10439  10440 -10441  624 -10443 0
 10439  10440 -10441  624 -10444 0

c  0-1 --> -1
c    (-b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧ -p_624) -> ( b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0)
c  in CNF:
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨  b^{8, 79}_2
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_1
c     b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨  b^{8, 79}_0
c  in DIMACS:
 10439  10440  10441  624  10442 0
 10439  10440  10441  624 -10443 0
 10439  10440  10441  624  10444 0

c  -1-1 --> -2
c    ( b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧  b^{8, 78}_0 ∧ -p_624) -> ( b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0)
c  in CNF:
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨  b^{8, 79}_2
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨  b^{8, 79}_1
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨  p_624 ∨ -b^{8, 79}_0
c  in DIMACS:
-10439  10440 -10441  624  10442 0
-10439  10440 -10441  624  10443 0
-10439  10440 -10441  624 -10444 0

c  -2-1 --> break 
c    ( b^{8, 78}_2 ∧  b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨  b^{8, 78}_0 ∨  p_624 ∨ break
c  in DIMACS:
-10439 -10440  10441  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 78}_2 ∧ -b^{8, 78}_1 ∧ -b^{8, 78}_0 ∧ true) 
c  in CNF:
c    -b^{8, 78}_2 ∨  b^{8, 78}_1 ∨  b^{8, 78}_0 ∨ false 
c  in DIMACS:
-10439  10440  10441  0

c  3 does not represent an automaton state.
c    -(-b^{8, 78}_2 ∧  b^{8, 78}_1 ∧  b^{8, 78}_0 ∧ true) 
c  in CNF:
c     b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ false 
c  in DIMACS:
 10439 -10440 -10441  0
c  -3 does not represent an automaton state.
c    -( b^{8, 78}_2 ∧  b^{8, 78}_1 ∧  b^{8, 78}_0 ∧ true) 
c  in CNF:
c    -b^{8, 78}_2 ∨ -b^{8, 78}_1 ∨ -b^{8, 78}_0 ∨ false 
c  in DIMACS:
-10439 -10440 -10441  0

c i = 79
c  -2+1 --> -1
c    ( b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧  p_632) -> ( b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0)
c  in CNF:
c    -b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨  b^{8, 80}_2
c    -b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_1
c    -b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨  b^{8, 80}_0
c  in DIMACS:
-10442 -10443  10444 -632  10445 0
-10442 -10443  10444 -632 -10446 0
-10442 -10443  10444 -632  10447 0

c  -1+1 --> 0
c    ( b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0 ∧  p_632) -> (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧ -b^{8, 80}_0)
c  in CNF:
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_2
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_1
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_0
c  in DIMACS:
-10442  10443 -10444 -632 -10445 0
-10442  10443 -10444 -632 -10446 0
-10442  10443 -10444 -632 -10447 0

c  0+1 --> 1
c    (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧  p_632) -> (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0)
c  in CNF:
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_2
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_1
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨  b^{8, 80}_0
c  in DIMACS:
 10442  10443  10444 -632 -10445 0
 10442  10443  10444 -632 -10446 0
 10442  10443  10444 -632  10447 0

c  1+1 --> 2
c    (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0 ∧  p_632) -> (-b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0)
c  in CNF:
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_2
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨  b^{8, 80}_1
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ -p_632 ∨ -b^{8, 80}_0
c  in DIMACS:
 10442  10443 -10444 -632 -10445 0
 10442  10443 -10444 -632  10446 0
 10442  10443 -10444 -632 -10447 0

c  2+1 --> break 
c    (-b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧  p_632) -> break
c  in CNF:
c     b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 10442 -10443  10444 -632 1162 0


c  2-1 --> 1
c    (-b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧ -p_632) -> (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0)
c  in CNF:
c     b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_2
c     b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_1
c     b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨  b^{8, 80}_0
c  in DIMACS:
 10442 -10443  10444  632 -10445 0
 10442 -10443  10444  632 -10446 0
 10442 -10443  10444  632  10447 0

c  1-1 --> 0
c    (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0 ∧ -p_632) -> (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧ -b^{8, 80}_0)
c  in CNF:
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_2
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_1
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_0
c  in DIMACS:
 10442  10443 -10444  632 -10445 0
 10442  10443 -10444  632 -10446 0
 10442  10443 -10444  632 -10447 0

c  0-1 --> -1
c    (-b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧ -p_632) -> ( b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0)
c  in CNF:
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨  b^{8, 80}_2
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_1
c     b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨  b^{8, 80}_0
c  in DIMACS:
 10442  10443  10444  632  10445 0
 10442  10443  10444  632 -10446 0
 10442  10443  10444  632  10447 0

c  -1-1 --> -2
c    ( b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧  b^{8, 79}_0 ∧ -p_632) -> ( b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0)
c  in CNF:
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨  b^{8, 80}_2
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨  b^{8, 80}_1
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨  p_632 ∨ -b^{8, 80}_0
c  in DIMACS:
-10442  10443 -10444  632  10445 0
-10442  10443 -10444  632  10446 0
-10442  10443 -10444  632 -10447 0

c  -2-1 --> break 
c    ( b^{8, 79}_2 ∧  b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨  b^{8, 79}_0 ∨  p_632 ∨ break
c  in DIMACS:
-10442 -10443  10444  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 79}_2 ∧ -b^{8, 79}_1 ∧ -b^{8, 79}_0 ∧ true) 
c  in CNF:
c    -b^{8, 79}_2 ∨  b^{8, 79}_1 ∨  b^{8, 79}_0 ∨ false 
c  in DIMACS:
-10442  10443  10444  0

c  3 does not represent an automaton state.
c    -(-b^{8, 79}_2 ∧  b^{8, 79}_1 ∧  b^{8, 79}_0 ∧ true) 
c  in CNF:
c     b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ false 
c  in DIMACS:
 10442 -10443 -10444  0
c  -3 does not represent an automaton state.
c    -( b^{8, 79}_2 ∧  b^{8, 79}_1 ∧  b^{8, 79}_0 ∧ true) 
c  in CNF:
c    -b^{8, 79}_2 ∨ -b^{8, 79}_1 ∨ -b^{8, 79}_0 ∨ false 
c  in DIMACS:
-10442 -10443 -10444  0

c i = 80
c  -2+1 --> -1
c    ( b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧  p_640) -> ( b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0)
c  in CNF:
c    -b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨  b^{8, 81}_2
c    -b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_1
c    -b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨  b^{8, 81}_0
c  in DIMACS:
-10445 -10446  10447 -640  10448 0
-10445 -10446  10447 -640 -10449 0
-10445 -10446  10447 -640  10450 0

c  -1+1 --> 0
c    ( b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0 ∧  p_640) -> (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧ -b^{8, 81}_0)
c  in CNF:
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_2
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_1
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_0
c  in DIMACS:
-10445  10446 -10447 -640 -10448 0
-10445  10446 -10447 -640 -10449 0
-10445  10446 -10447 -640 -10450 0

c  0+1 --> 1
c    (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧  p_640) -> (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0)
c  in CNF:
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_2
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_1
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨  b^{8, 81}_0
c  in DIMACS:
 10445  10446  10447 -640 -10448 0
 10445  10446  10447 -640 -10449 0
 10445  10446  10447 -640  10450 0

c  1+1 --> 2
c    (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0 ∧  p_640) -> (-b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0)
c  in CNF:
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_2
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨  b^{8, 81}_1
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ -p_640 ∨ -b^{8, 81}_0
c  in DIMACS:
 10445  10446 -10447 -640 -10448 0
 10445  10446 -10447 -640  10449 0
 10445  10446 -10447 -640 -10450 0

c  2+1 --> break 
c    (-b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧  p_640) -> break
c  in CNF:
c     b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 10445 -10446  10447 -640 1162 0


c  2-1 --> 1
c    (-b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧ -p_640) -> (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0)
c  in CNF:
c     b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_2
c     b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_1
c     b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨  b^{8, 81}_0
c  in DIMACS:
 10445 -10446  10447  640 -10448 0
 10445 -10446  10447  640 -10449 0
 10445 -10446  10447  640  10450 0

c  1-1 --> 0
c    (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0 ∧ -p_640) -> (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧ -b^{8, 81}_0)
c  in CNF:
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_2
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_1
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_0
c  in DIMACS:
 10445  10446 -10447  640 -10448 0
 10445  10446 -10447  640 -10449 0
 10445  10446 -10447  640 -10450 0

c  0-1 --> -1
c    (-b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧ -p_640) -> ( b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0)
c  in CNF:
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨  b^{8, 81}_2
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_1
c     b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨  b^{8, 81}_0
c  in DIMACS:
 10445  10446  10447  640  10448 0
 10445  10446  10447  640 -10449 0
 10445  10446  10447  640  10450 0

c  -1-1 --> -2
c    ( b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧  b^{8, 80}_0 ∧ -p_640) -> ( b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0)
c  in CNF:
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨  b^{8, 81}_2
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨  b^{8, 81}_1
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨  p_640 ∨ -b^{8, 81}_0
c  in DIMACS:
-10445  10446 -10447  640  10448 0
-10445  10446 -10447  640  10449 0
-10445  10446 -10447  640 -10450 0

c  -2-1 --> break 
c    ( b^{8, 80}_2 ∧  b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨  b^{8, 80}_0 ∨  p_640 ∨ break
c  in DIMACS:
-10445 -10446  10447  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 80}_2 ∧ -b^{8, 80}_1 ∧ -b^{8, 80}_0 ∧ true) 
c  in CNF:
c    -b^{8, 80}_2 ∨  b^{8, 80}_1 ∨  b^{8, 80}_0 ∨ false 
c  in DIMACS:
-10445  10446  10447  0

c  3 does not represent an automaton state.
c    -(-b^{8, 80}_2 ∧  b^{8, 80}_1 ∧  b^{8, 80}_0 ∧ true) 
c  in CNF:
c     b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ false 
c  in DIMACS:
 10445 -10446 -10447  0
c  -3 does not represent an automaton state.
c    -( b^{8, 80}_2 ∧  b^{8, 80}_1 ∧  b^{8, 80}_0 ∧ true) 
c  in CNF:
c    -b^{8, 80}_2 ∨ -b^{8, 80}_1 ∨ -b^{8, 80}_0 ∨ false 
c  in DIMACS:
-10445 -10446 -10447  0

c i = 81
c  -2+1 --> -1
c    ( b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧  p_648) -> ( b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0)
c  in CNF:
c    -b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨  b^{8, 82}_2
c    -b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_1
c    -b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨  b^{8, 82}_0
c  in DIMACS:
-10448 -10449  10450 -648  10451 0
-10448 -10449  10450 -648 -10452 0
-10448 -10449  10450 -648  10453 0

c  -1+1 --> 0
c    ( b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0 ∧  p_648) -> (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧ -b^{8, 82}_0)
c  in CNF:
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_2
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_1
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_0
c  in DIMACS:
-10448  10449 -10450 -648 -10451 0
-10448  10449 -10450 -648 -10452 0
-10448  10449 -10450 -648 -10453 0

c  0+1 --> 1
c    (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧  p_648) -> (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0)
c  in CNF:
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_2
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_1
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨  b^{8, 82}_0
c  in DIMACS:
 10448  10449  10450 -648 -10451 0
 10448  10449  10450 -648 -10452 0
 10448  10449  10450 -648  10453 0

c  1+1 --> 2
c    (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0 ∧  p_648) -> (-b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0)
c  in CNF:
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_2
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨  b^{8, 82}_1
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ -p_648 ∨ -b^{8, 82}_0
c  in DIMACS:
 10448  10449 -10450 -648 -10451 0
 10448  10449 -10450 -648  10452 0
 10448  10449 -10450 -648 -10453 0

c  2+1 --> break 
c    (-b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧  p_648) -> break
c  in CNF:
c     b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 10448 -10449  10450 -648 1162 0


c  2-1 --> 1
c    (-b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧ -p_648) -> (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0)
c  in CNF:
c     b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_2
c     b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_1
c     b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨  b^{8, 82}_0
c  in DIMACS:
 10448 -10449  10450  648 -10451 0
 10448 -10449  10450  648 -10452 0
 10448 -10449  10450  648  10453 0

c  1-1 --> 0
c    (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0 ∧ -p_648) -> (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧ -b^{8, 82}_0)
c  in CNF:
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_2
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_1
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_0
c  in DIMACS:
 10448  10449 -10450  648 -10451 0
 10448  10449 -10450  648 -10452 0
 10448  10449 -10450  648 -10453 0

c  0-1 --> -1
c    (-b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧ -p_648) -> ( b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0)
c  in CNF:
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨  b^{8, 82}_2
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_1
c     b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨  b^{8, 82}_0
c  in DIMACS:
 10448  10449  10450  648  10451 0
 10448  10449  10450  648 -10452 0
 10448  10449  10450  648  10453 0

c  -1-1 --> -2
c    ( b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧  b^{8, 81}_0 ∧ -p_648) -> ( b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0)
c  in CNF:
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨  b^{8, 82}_2
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨  b^{8, 82}_1
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨  p_648 ∨ -b^{8, 82}_0
c  in DIMACS:
-10448  10449 -10450  648  10451 0
-10448  10449 -10450  648  10452 0
-10448  10449 -10450  648 -10453 0

c  -2-1 --> break 
c    ( b^{8, 81}_2 ∧  b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨  b^{8, 81}_0 ∨  p_648 ∨ break
c  in DIMACS:
-10448 -10449  10450  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 81}_2 ∧ -b^{8, 81}_1 ∧ -b^{8, 81}_0 ∧ true) 
c  in CNF:
c    -b^{8, 81}_2 ∨  b^{8, 81}_1 ∨  b^{8, 81}_0 ∨ false 
c  in DIMACS:
-10448  10449  10450  0

c  3 does not represent an automaton state.
c    -(-b^{8, 81}_2 ∧  b^{8, 81}_1 ∧  b^{8, 81}_0 ∧ true) 
c  in CNF:
c     b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ false 
c  in DIMACS:
 10448 -10449 -10450  0
c  -3 does not represent an automaton state.
c    -( b^{8, 81}_2 ∧  b^{8, 81}_1 ∧  b^{8, 81}_0 ∧ true) 
c  in CNF:
c    -b^{8, 81}_2 ∨ -b^{8, 81}_1 ∨ -b^{8, 81}_0 ∨ false 
c  in DIMACS:
-10448 -10449 -10450  0

c i = 82
c  -2+1 --> -1
c    ( b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧  p_656) -> ( b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0)
c  in CNF:
c    -b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨  b^{8, 83}_2
c    -b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_1
c    -b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨  b^{8, 83}_0
c  in DIMACS:
-10451 -10452  10453 -656  10454 0
-10451 -10452  10453 -656 -10455 0
-10451 -10452  10453 -656  10456 0

c  -1+1 --> 0
c    ( b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0 ∧  p_656) -> (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧ -b^{8, 83}_0)
c  in CNF:
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_2
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_1
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_0
c  in DIMACS:
-10451  10452 -10453 -656 -10454 0
-10451  10452 -10453 -656 -10455 0
-10451  10452 -10453 -656 -10456 0

c  0+1 --> 1
c    (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧  p_656) -> (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0)
c  in CNF:
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_2
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_1
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨  b^{8, 83}_0
c  in DIMACS:
 10451  10452  10453 -656 -10454 0
 10451  10452  10453 -656 -10455 0
 10451  10452  10453 -656  10456 0

c  1+1 --> 2
c    (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0 ∧  p_656) -> (-b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0)
c  in CNF:
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_2
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨  b^{8, 83}_1
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ -p_656 ∨ -b^{8, 83}_0
c  in DIMACS:
 10451  10452 -10453 -656 -10454 0
 10451  10452 -10453 -656  10455 0
 10451  10452 -10453 -656 -10456 0

c  2+1 --> break 
c    (-b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧  p_656) -> break
c  in CNF:
c     b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 10451 -10452  10453 -656 1162 0


c  2-1 --> 1
c    (-b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧ -p_656) -> (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0)
c  in CNF:
c     b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_2
c     b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_1
c     b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨  b^{8, 83}_0
c  in DIMACS:
 10451 -10452  10453  656 -10454 0
 10451 -10452  10453  656 -10455 0
 10451 -10452  10453  656  10456 0

c  1-1 --> 0
c    (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0 ∧ -p_656) -> (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧ -b^{8, 83}_0)
c  in CNF:
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_2
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_1
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_0
c  in DIMACS:
 10451  10452 -10453  656 -10454 0
 10451  10452 -10453  656 -10455 0
 10451  10452 -10453  656 -10456 0

c  0-1 --> -1
c    (-b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧ -p_656) -> ( b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0)
c  in CNF:
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨  b^{8, 83}_2
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_1
c     b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨  b^{8, 83}_0
c  in DIMACS:
 10451  10452  10453  656  10454 0
 10451  10452  10453  656 -10455 0
 10451  10452  10453  656  10456 0

c  -1-1 --> -2
c    ( b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧  b^{8, 82}_0 ∧ -p_656) -> ( b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0)
c  in CNF:
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨  b^{8, 83}_2
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨  b^{8, 83}_1
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨  p_656 ∨ -b^{8, 83}_0
c  in DIMACS:
-10451  10452 -10453  656  10454 0
-10451  10452 -10453  656  10455 0
-10451  10452 -10453  656 -10456 0

c  -2-1 --> break 
c    ( b^{8, 82}_2 ∧  b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨  b^{8, 82}_0 ∨  p_656 ∨ break
c  in DIMACS:
-10451 -10452  10453  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 82}_2 ∧ -b^{8, 82}_1 ∧ -b^{8, 82}_0 ∧ true) 
c  in CNF:
c    -b^{8, 82}_2 ∨  b^{8, 82}_1 ∨  b^{8, 82}_0 ∨ false 
c  in DIMACS:
-10451  10452  10453  0

c  3 does not represent an automaton state.
c    -(-b^{8, 82}_2 ∧  b^{8, 82}_1 ∧  b^{8, 82}_0 ∧ true) 
c  in CNF:
c     b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ false 
c  in DIMACS:
 10451 -10452 -10453  0
c  -3 does not represent an automaton state.
c    -( b^{8, 82}_2 ∧  b^{8, 82}_1 ∧  b^{8, 82}_0 ∧ true) 
c  in CNF:
c    -b^{8, 82}_2 ∨ -b^{8, 82}_1 ∨ -b^{8, 82}_0 ∨ false 
c  in DIMACS:
-10451 -10452 -10453  0

c i = 83
c  -2+1 --> -1
c    ( b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧  p_664) -> ( b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0)
c  in CNF:
c    -b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨  b^{8, 84}_2
c    -b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_1
c    -b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨  b^{8, 84}_0
c  in DIMACS:
-10454 -10455  10456 -664  10457 0
-10454 -10455  10456 -664 -10458 0
-10454 -10455  10456 -664  10459 0

c  -1+1 --> 0
c    ( b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0 ∧  p_664) -> (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧ -b^{8, 84}_0)
c  in CNF:
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_2
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_1
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_0
c  in DIMACS:
-10454  10455 -10456 -664 -10457 0
-10454  10455 -10456 -664 -10458 0
-10454  10455 -10456 -664 -10459 0

c  0+1 --> 1
c    (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧  p_664) -> (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0)
c  in CNF:
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_2
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_1
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨  b^{8, 84}_0
c  in DIMACS:
 10454  10455  10456 -664 -10457 0
 10454  10455  10456 -664 -10458 0
 10454  10455  10456 -664  10459 0

c  1+1 --> 2
c    (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0 ∧  p_664) -> (-b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0)
c  in CNF:
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_2
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨  b^{8, 84}_1
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ -p_664 ∨ -b^{8, 84}_0
c  in DIMACS:
 10454  10455 -10456 -664 -10457 0
 10454  10455 -10456 -664  10458 0
 10454  10455 -10456 -664 -10459 0

c  2+1 --> break 
c    (-b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧  p_664) -> break
c  in CNF:
c     b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 10454 -10455  10456 -664 1162 0


c  2-1 --> 1
c    (-b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧ -p_664) -> (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0)
c  in CNF:
c     b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_2
c     b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_1
c     b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨  b^{8, 84}_0
c  in DIMACS:
 10454 -10455  10456  664 -10457 0
 10454 -10455  10456  664 -10458 0
 10454 -10455  10456  664  10459 0

c  1-1 --> 0
c    (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0 ∧ -p_664) -> (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧ -b^{8, 84}_0)
c  in CNF:
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_2
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_1
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_0
c  in DIMACS:
 10454  10455 -10456  664 -10457 0
 10454  10455 -10456  664 -10458 0
 10454  10455 -10456  664 -10459 0

c  0-1 --> -1
c    (-b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧ -p_664) -> ( b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0)
c  in CNF:
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨  b^{8, 84}_2
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_1
c     b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨  b^{8, 84}_0
c  in DIMACS:
 10454  10455  10456  664  10457 0
 10454  10455  10456  664 -10458 0
 10454  10455  10456  664  10459 0

c  -1-1 --> -2
c    ( b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧  b^{8, 83}_0 ∧ -p_664) -> ( b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0)
c  in CNF:
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨  b^{8, 84}_2
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨  b^{8, 84}_1
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨  p_664 ∨ -b^{8, 84}_0
c  in DIMACS:
-10454  10455 -10456  664  10457 0
-10454  10455 -10456  664  10458 0
-10454  10455 -10456  664 -10459 0

c  -2-1 --> break 
c    ( b^{8, 83}_2 ∧  b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨  b^{8, 83}_0 ∨  p_664 ∨ break
c  in DIMACS:
-10454 -10455  10456  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 83}_2 ∧ -b^{8, 83}_1 ∧ -b^{8, 83}_0 ∧ true) 
c  in CNF:
c    -b^{8, 83}_2 ∨  b^{8, 83}_1 ∨  b^{8, 83}_0 ∨ false 
c  in DIMACS:
-10454  10455  10456  0

c  3 does not represent an automaton state.
c    -(-b^{8, 83}_2 ∧  b^{8, 83}_1 ∧  b^{8, 83}_0 ∧ true) 
c  in CNF:
c     b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ false 
c  in DIMACS:
 10454 -10455 -10456  0
c  -3 does not represent an automaton state.
c    -( b^{8, 83}_2 ∧  b^{8, 83}_1 ∧  b^{8, 83}_0 ∧ true) 
c  in CNF:
c    -b^{8, 83}_2 ∨ -b^{8, 83}_1 ∨ -b^{8, 83}_0 ∨ false 
c  in DIMACS:
-10454 -10455 -10456  0

c i = 84
c  -2+1 --> -1
c    ( b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧  p_672) -> ( b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0)
c  in CNF:
c    -b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨  b^{8, 85}_2
c    -b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_1
c    -b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨  b^{8, 85}_0
c  in DIMACS:
-10457 -10458  10459 -672  10460 0
-10457 -10458  10459 -672 -10461 0
-10457 -10458  10459 -672  10462 0

c  -1+1 --> 0
c    ( b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0 ∧  p_672) -> (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧ -b^{8, 85}_0)
c  in CNF:
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_2
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_1
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_0
c  in DIMACS:
-10457  10458 -10459 -672 -10460 0
-10457  10458 -10459 -672 -10461 0
-10457  10458 -10459 -672 -10462 0

c  0+1 --> 1
c    (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧  p_672) -> (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0)
c  in CNF:
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_2
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_1
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨  b^{8, 85}_0
c  in DIMACS:
 10457  10458  10459 -672 -10460 0
 10457  10458  10459 -672 -10461 0
 10457  10458  10459 -672  10462 0

c  1+1 --> 2
c    (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0 ∧  p_672) -> (-b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0)
c  in CNF:
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_2
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨  b^{8, 85}_1
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ -p_672 ∨ -b^{8, 85}_0
c  in DIMACS:
 10457  10458 -10459 -672 -10460 0
 10457  10458 -10459 -672  10461 0
 10457  10458 -10459 -672 -10462 0

c  2+1 --> break 
c    (-b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧  p_672) -> break
c  in CNF:
c     b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 10457 -10458  10459 -672 1162 0


c  2-1 --> 1
c    (-b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧ -p_672) -> (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0)
c  in CNF:
c     b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_2
c     b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_1
c     b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨  b^{8, 85}_0
c  in DIMACS:
 10457 -10458  10459  672 -10460 0
 10457 -10458  10459  672 -10461 0
 10457 -10458  10459  672  10462 0

c  1-1 --> 0
c    (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0 ∧ -p_672) -> (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧ -b^{8, 85}_0)
c  in CNF:
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_2
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_1
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_0
c  in DIMACS:
 10457  10458 -10459  672 -10460 0
 10457  10458 -10459  672 -10461 0
 10457  10458 -10459  672 -10462 0

c  0-1 --> -1
c    (-b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧ -p_672) -> ( b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0)
c  in CNF:
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨  b^{8, 85}_2
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_1
c     b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨  b^{8, 85}_0
c  in DIMACS:
 10457  10458  10459  672  10460 0
 10457  10458  10459  672 -10461 0
 10457  10458  10459  672  10462 0

c  -1-1 --> -2
c    ( b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧  b^{8, 84}_0 ∧ -p_672) -> ( b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0)
c  in CNF:
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨  b^{8, 85}_2
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨  b^{8, 85}_1
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨  p_672 ∨ -b^{8, 85}_0
c  in DIMACS:
-10457  10458 -10459  672  10460 0
-10457  10458 -10459  672  10461 0
-10457  10458 -10459  672 -10462 0

c  -2-1 --> break 
c    ( b^{8, 84}_2 ∧  b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨  b^{8, 84}_0 ∨  p_672 ∨ break
c  in DIMACS:
-10457 -10458  10459  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 84}_2 ∧ -b^{8, 84}_1 ∧ -b^{8, 84}_0 ∧ true) 
c  in CNF:
c    -b^{8, 84}_2 ∨  b^{8, 84}_1 ∨  b^{8, 84}_0 ∨ false 
c  in DIMACS:
-10457  10458  10459  0

c  3 does not represent an automaton state.
c    -(-b^{8, 84}_2 ∧  b^{8, 84}_1 ∧  b^{8, 84}_0 ∧ true) 
c  in CNF:
c     b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ false 
c  in DIMACS:
 10457 -10458 -10459  0
c  -3 does not represent an automaton state.
c    -( b^{8, 84}_2 ∧  b^{8, 84}_1 ∧  b^{8, 84}_0 ∧ true) 
c  in CNF:
c    -b^{8, 84}_2 ∨ -b^{8, 84}_1 ∨ -b^{8, 84}_0 ∨ false 
c  in DIMACS:
-10457 -10458 -10459  0

c i = 85
c  -2+1 --> -1
c    ( b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧  p_680) -> ( b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0)
c  in CNF:
c    -b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨  b^{8, 86}_2
c    -b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_1
c    -b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨  b^{8, 86}_0
c  in DIMACS:
-10460 -10461  10462 -680  10463 0
-10460 -10461  10462 -680 -10464 0
-10460 -10461  10462 -680  10465 0

c  -1+1 --> 0
c    ( b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0 ∧  p_680) -> (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧ -b^{8, 86}_0)
c  in CNF:
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_2
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_1
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_0
c  in DIMACS:
-10460  10461 -10462 -680 -10463 0
-10460  10461 -10462 -680 -10464 0
-10460  10461 -10462 -680 -10465 0

c  0+1 --> 1
c    (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧  p_680) -> (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0)
c  in CNF:
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_2
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_1
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨  b^{8, 86}_0
c  in DIMACS:
 10460  10461  10462 -680 -10463 0
 10460  10461  10462 -680 -10464 0
 10460  10461  10462 -680  10465 0

c  1+1 --> 2
c    (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0 ∧  p_680) -> (-b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0)
c  in CNF:
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_2
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨  b^{8, 86}_1
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ -p_680 ∨ -b^{8, 86}_0
c  in DIMACS:
 10460  10461 -10462 -680 -10463 0
 10460  10461 -10462 -680  10464 0
 10460  10461 -10462 -680 -10465 0

c  2+1 --> break 
c    (-b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧  p_680) -> break
c  in CNF:
c     b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 10460 -10461  10462 -680 1162 0


c  2-1 --> 1
c    (-b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧ -p_680) -> (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0)
c  in CNF:
c     b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_2
c     b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_1
c     b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨  b^{8, 86}_0
c  in DIMACS:
 10460 -10461  10462  680 -10463 0
 10460 -10461  10462  680 -10464 0
 10460 -10461  10462  680  10465 0

c  1-1 --> 0
c    (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0 ∧ -p_680) -> (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧ -b^{8, 86}_0)
c  in CNF:
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_2
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_1
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_0
c  in DIMACS:
 10460  10461 -10462  680 -10463 0
 10460  10461 -10462  680 -10464 0
 10460  10461 -10462  680 -10465 0

c  0-1 --> -1
c    (-b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧ -p_680) -> ( b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0)
c  in CNF:
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨  b^{8, 86}_2
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_1
c     b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨  b^{8, 86}_0
c  in DIMACS:
 10460  10461  10462  680  10463 0
 10460  10461  10462  680 -10464 0
 10460  10461  10462  680  10465 0

c  -1-1 --> -2
c    ( b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧  b^{8, 85}_0 ∧ -p_680) -> ( b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0)
c  in CNF:
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨  b^{8, 86}_2
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨  b^{8, 86}_1
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨  p_680 ∨ -b^{8, 86}_0
c  in DIMACS:
-10460  10461 -10462  680  10463 0
-10460  10461 -10462  680  10464 0
-10460  10461 -10462  680 -10465 0

c  -2-1 --> break 
c    ( b^{8, 85}_2 ∧  b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨  b^{8, 85}_0 ∨  p_680 ∨ break
c  in DIMACS:
-10460 -10461  10462  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 85}_2 ∧ -b^{8, 85}_1 ∧ -b^{8, 85}_0 ∧ true) 
c  in CNF:
c    -b^{8, 85}_2 ∨  b^{8, 85}_1 ∨  b^{8, 85}_0 ∨ false 
c  in DIMACS:
-10460  10461  10462  0

c  3 does not represent an automaton state.
c    -(-b^{8, 85}_2 ∧  b^{8, 85}_1 ∧  b^{8, 85}_0 ∧ true) 
c  in CNF:
c     b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ false 
c  in DIMACS:
 10460 -10461 -10462  0
c  -3 does not represent an automaton state.
c    -( b^{8, 85}_2 ∧  b^{8, 85}_1 ∧  b^{8, 85}_0 ∧ true) 
c  in CNF:
c    -b^{8, 85}_2 ∨ -b^{8, 85}_1 ∨ -b^{8, 85}_0 ∨ false 
c  in DIMACS:
-10460 -10461 -10462  0

c i = 86
c  -2+1 --> -1
c    ( b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧  p_688) -> ( b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0)
c  in CNF:
c    -b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨  b^{8, 87}_2
c    -b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_1
c    -b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨  b^{8, 87}_0
c  in DIMACS:
-10463 -10464  10465 -688  10466 0
-10463 -10464  10465 -688 -10467 0
-10463 -10464  10465 -688  10468 0

c  -1+1 --> 0
c    ( b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0 ∧  p_688) -> (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧ -b^{8, 87}_0)
c  in CNF:
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_2
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_1
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_0
c  in DIMACS:
-10463  10464 -10465 -688 -10466 0
-10463  10464 -10465 -688 -10467 0
-10463  10464 -10465 -688 -10468 0

c  0+1 --> 1
c    (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧  p_688) -> (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0)
c  in CNF:
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_2
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_1
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨  b^{8, 87}_0
c  in DIMACS:
 10463  10464  10465 -688 -10466 0
 10463  10464  10465 -688 -10467 0
 10463  10464  10465 -688  10468 0

c  1+1 --> 2
c    (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0 ∧  p_688) -> (-b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0)
c  in CNF:
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_2
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨  b^{8, 87}_1
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ -p_688 ∨ -b^{8, 87}_0
c  in DIMACS:
 10463  10464 -10465 -688 -10466 0
 10463  10464 -10465 -688  10467 0
 10463  10464 -10465 -688 -10468 0

c  2+1 --> break 
c    (-b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧  p_688) -> break
c  in CNF:
c     b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 10463 -10464  10465 -688 1162 0


c  2-1 --> 1
c    (-b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧ -p_688) -> (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0)
c  in CNF:
c     b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_2
c     b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_1
c     b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨  b^{8, 87}_0
c  in DIMACS:
 10463 -10464  10465  688 -10466 0
 10463 -10464  10465  688 -10467 0
 10463 -10464  10465  688  10468 0

c  1-1 --> 0
c    (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0 ∧ -p_688) -> (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧ -b^{8, 87}_0)
c  in CNF:
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_2
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_1
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_0
c  in DIMACS:
 10463  10464 -10465  688 -10466 0
 10463  10464 -10465  688 -10467 0
 10463  10464 -10465  688 -10468 0

c  0-1 --> -1
c    (-b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧ -p_688) -> ( b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0)
c  in CNF:
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨  b^{8, 87}_2
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_1
c     b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨  b^{8, 87}_0
c  in DIMACS:
 10463  10464  10465  688  10466 0
 10463  10464  10465  688 -10467 0
 10463  10464  10465  688  10468 0

c  -1-1 --> -2
c    ( b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧  b^{8, 86}_0 ∧ -p_688) -> ( b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0)
c  in CNF:
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨  b^{8, 87}_2
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨  b^{8, 87}_1
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨  p_688 ∨ -b^{8, 87}_0
c  in DIMACS:
-10463  10464 -10465  688  10466 0
-10463  10464 -10465  688  10467 0
-10463  10464 -10465  688 -10468 0

c  -2-1 --> break 
c    ( b^{8, 86}_2 ∧  b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨  b^{8, 86}_0 ∨  p_688 ∨ break
c  in DIMACS:
-10463 -10464  10465  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 86}_2 ∧ -b^{8, 86}_1 ∧ -b^{8, 86}_0 ∧ true) 
c  in CNF:
c    -b^{8, 86}_2 ∨  b^{8, 86}_1 ∨  b^{8, 86}_0 ∨ false 
c  in DIMACS:
-10463  10464  10465  0

c  3 does not represent an automaton state.
c    -(-b^{8, 86}_2 ∧  b^{8, 86}_1 ∧  b^{8, 86}_0 ∧ true) 
c  in CNF:
c     b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ false 
c  in DIMACS:
 10463 -10464 -10465  0
c  -3 does not represent an automaton state.
c    -( b^{8, 86}_2 ∧  b^{8, 86}_1 ∧  b^{8, 86}_0 ∧ true) 
c  in CNF:
c    -b^{8, 86}_2 ∨ -b^{8, 86}_1 ∨ -b^{8, 86}_0 ∨ false 
c  in DIMACS:
-10463 -10464 -10465  0

c i = 87
c  -2+1 --> -1
c    ( b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧  p_696) -> ( b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0)
c  in CNF:
c    -b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨  b^{8, 88}_2
c    -b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_1
c    -b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨  b^{8, 88}_0
c  in DIMACS:
-10466 -10467  10468 -696  10469 0
-10466 -10467  10468 -696 -10470 0
-10466 -10467  10468 -696  10471 0

c  -1+1 --> 0
c    ( b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0 ∧  p_696) -> (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧ -b^{8, 88}_0)
c  in CNF:
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_2
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_1
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_0
c  in DIMACS:
-10466  10467 -10468 -696 -10469 0
-10466  10467 -10468 -696 -10470 0
-10466  10467 -10468 -696 -10471 0

c  0+1 --> 1
c    (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧  p_696) -> (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0)
c  in CNF:
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_2
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_1
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨  b^{8, 88}_0
c  in DIMACS:
 10466  10467  10468 -696 -10469 0
 10466  10467  10468 -696 -10470 0
 10466  10467  10468 -696  10471 0

c  1+1 --> 2
c    (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0 ∧  p_696) -> (-b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0)
c  in CNF:
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_2
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨  b^{8, 88}_1
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ -p_696 ∨ -b^{8, 88}_0
c  in DIMACS:
 10466  10467 -10468 -696 -10469 0
 10466  10467 -10468 -696  10470 0
 10466  10467 -10468 -696 -10471 0

c  2+1 --> break 
c    (-b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧  p_696) -> break
c  in CNF:
c     b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 10466 -10467  10468 -696 1162 0


c  2-1 --> 1
c    (-b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧ -p_696) -> (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0)
c  in CNF:
c     b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_2
c     b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_1
c     b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨  b^{8, 88}_0
c  in DIMACS:
 10466 -10467  10468  696 -10469 0
 10466 -10467  10468  696 -10470 0
 10466 -10467  10468  696  10471 0

c  1-1 --> 0
c    (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0 ∧ -p_696) -> (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧ -b^{8, 88}_0)
c  in CNF:
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_2
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_1
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_0
c  in DIMACS:
 10466  10467 -10468  696 -10469 0
 10466  10467 -10468  696 -10470 0
 10466  10467 -10468  696 -10471 0

c  0-1 --> -1
c    (-b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧ -p_696) -> ( b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0)
c  in CNF:
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨  b^{8, 88}_2
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_1
c     b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨  b^{8, 88}_0
c  in DIMACS:
 10466  10467  10468  696  10469 0
 10466  10467  10468  696 -10470 0
 10466  10467  10468  696  10471 0

c  -1-1 --> -2
c    ( b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧  b^{8, 87}_0 ∧ -p_696) -> ( b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0)
c  in CNF:
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨  b^{8, 88}_2
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨  b^{8, 88}_1
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨  p_696 ∨ -b^{8, 88}_0
c  in DIMACS:
-10466  10467 -10468  696  10469 0
-10466  10467 -10468  696  10470 0
-10466  10467 -10468  696 -10471 0

c  -2-1 --> break 
c    ( b^{8, 87}_2 ∧  b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨  b^{8, 87}_0 ∨  p_696 ∨ break
c  in DIMACS:
-10466 -10467  10468  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 87}_2 ∧ -b^{8, 87}_1 ∧ -b^{8, 87}_0 ∧ true) 
c  in CNF:
c    -b^{8, 87}_2 ∨  b^{8, 87}_1 ∨  b^{8, 87}_0 ∨ false 
c  in DIMACS:
-10466  10467  10468  0

c  3 does not represent an automaton state.
c    -(-b^{8, 87}_2 ∧  b^{8, 87}_1 ∧  b^{8, 87}_0 ∧ true) 
c  in CNF:
c     b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ false 
c  in DIMACS:
 10466 -10467 -10468  0
c  -3 does not represent an automaton state.
c    -( b^{8, 87}_2 ∧  b^{8, 87}_1 ∧  b^{8, 87}_0 ∧ true) 
c  in CNF:
c    -b^{8, 87}_2 ∨ -b^{8, 87}_1 ∨ -b^{8, 87}_0 ∨ false 
c  in DIMACS:
-10466 -10467 -10468  0

c i = 88
c  -2+1 --> -1
c    ( b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧  p_704) -> ( b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0)
c  in CNF:
c    -b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨  b^{8, 89}_2
c    -b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_1
c    -b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨  b^{8, 89}_0
c  in DIMACS:
-10469 -10470  10471 -704  10472 0
-10469 -10470  10471 -704 -10473 0
-10469 -10470  10471 -704  10474 0

c  -1+1 --> 0
c    ( b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0 ∧  p_704) -> (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧ -b^{8, 89}_0)
c  in CNF:
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_2
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_1
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_0
c  in DIMACS:
-10469  10470 -10471 -704 -10472 0
-10469  10470 -10471 -704 -10473 0
-10469  10470 -10471 -704 -10474 0

c  0+1 --> 1
c    (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧  p_704) -> (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0)
c  in CNF:
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_2
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_1
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨  b^{8, 89}_0
c  in DIMACS:
 10469  10470  10471 -704 -10472 0
 10469  10470  10471 -704 -10473 0
 10469  10470  10471 -704  10474 0

c  1+1 --> 2
c    (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0 ∧  p_704) -> (-b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0)
c  in CNF:
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_2
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨  b^{8, 89}_1
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ -p_704 ∨ -b^{8, 89}_0
c  in DIMACS:
 10469  10470 -10471 -704 -10472 0
 10469  10470 -10471 -704  10473 0
 10469  10470 -10471 -704 -10474 0

c  2+1 --> break 
c    (-b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧  p_704) -> break
c  in CNF:
c     b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 10469 -10470  10471 -704 1162 0


c  2-1 --> 1
c    (-b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧ -p_704) -> (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0)
c  in CNF:
c     b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_2
c     b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_1
c     b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨  b^{8, 89}_0
c  in DIMACS:
 10469 -10470  10471  704 -10472 0
 10469 -10470  10471  704 -10473 0
 10469 -10470  10471  704  10474 0

c  1-1 --> 0
c    (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0 ∧ -p_704) -> (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧ -b^{8, 89}_0)
c  in CNF:
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_2
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_1
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_0
c  in DIMACS:
 10469  10470 -10471  704 -10472 0
 10469  10470 -10471  704 -10473 0
 10469  10470 -10471  704 -10474 0

c  0-1 --> -1
c    (-b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧ -p_704) -> ( b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0)
c  in CNF:
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨  b^{8, 89}_2
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_1
c     b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨  b^{8, 89}_0
c  in DIMACS:
 10469  10470  10471  704  10472 0
 10469  10470  10471  704 -10473 0
 10469  10470  10471  704  10474 0

c  -1-1 --> -2
c    ( b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧  b^{8, 88}_0 ∧ -p_704) -> ( b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0)
c  in CNF:
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨  b^{8, 89}_2
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨  b^{8, 89}_1
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨  p_704 ∨ -b^{8, 89}_0
c  in DIMACS:
-10469  10470 -10471  704  10472 0
-10469  10470 -10471  704  10473 0
-10469  10470 -10471  704 -10474 0

c  -2-1 --> break 
c    ( b^{8, 88}_2 ∧  b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨  b^{8, 88}_0 ∨  p_704 ∨ break
c  in DIMACS:
-10469 -10470  10471  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 88}_2 ∧ -b^{8, 88}_1 ∧ -b^{8, 88}_0 ∧ true) 
c  in CNF:
c    -b^{8, 88}_2 ∨  b^{8, 88}_1 ∨  b^{8, 88}_0 ∨ false 
c  in DIMACS:
-10469  10470  10471  0

c  3 does not represent an automaton state.
c    -(-b^{8, 88}_2 ∧  b^{8, 88}_1 ∧  b^{8, 88}_0 ∧ true) 
c  in CNF:
c     b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ false 
c  in DIMACS:
 10469 -10470 -10471  0
c  -3 does not represent an automaton state.
c    -( b^{8, 88}_2 ∧  b^{8, 88}_1 ∧  b^{8, 88}_0 ∧ true) 
c  in CNF:
c    -b^{8, 88}_2 ∨ -b^{8, 88}_1 ∨ -b^{8, 88}_0 ∨ false 
c  in DIMACS:
-10469 -10470 -10471  0

c i = 89
c  -2+1 --> -1
c    ( b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧  p_712) -> ( b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0)
c  in CNF:
c    -b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨  b^{8, 90}_2
c    -b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_1
c    -b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨  b^{8, 90}_0
c  in DIMACS:
-10472 -10473  10474 -712  10475 0
-10472 -10473  10474 -712 -10476 0
-10472 -10473  10474 -712  10477 0

c  -1+1 --> 0
c    ( b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0 ∧  p_712) -> (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧ -b^{8, 90}_0)
c  in CNF:
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_2
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_1
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_0
c  in DIMACS:
-10472  10473 -10474 -712 -10475 0
-10472  10473 -10474 -712 -10476 0
-10472  10473 -10474 -712 -10477 0

c  0+1 --> 1
c    (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧  p_712) -> (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0)
c  in CNF:
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_2
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_1
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨  b^{8, 90}_0
c  in DIMACS:
 10472  10473  10474 -712 -10475 0
 10472  10473  10474 -712 -10476 0
 10472  10473  10474 -712  10477 0

c  1+1 --> 2
c    (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0 ∧  p_712) -> (-b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0)
c  in CNF:
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_2
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨  b^{8, 90}_1
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ -p_712 ∨ -b^{8, 90}_0
c  in DIMACS:
 10472  10473 -10474 -712 -10475 0
 10472  10473 -10474 -712  10476 0
 10472  10473 -10474 -712 -10477 0

c  2+1 --> break 
c    (-b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧  p_712) -> break
c  in CNF:
c     b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 10472 -10473  10474 -712 1162 0


c  2-1 --> 1
c    (-b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧ -p_712) -> (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0)
c  in CNF:
c     b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_2
c     b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_1
c     b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨  b^{8, 90}_0
c  in DIMACS:
 10472 -10473  10474  712 -10475 0
 10472 -10473  10474  712 -10476 0
 10472 -10473  10474  712  10477 0

c  1-1 --> 0
c    (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0 ∧ -p_712) -> (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧ -b^{8, 90}_0)
c  in CNF:
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_2
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_1
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_0
c  in DIMACS:
 10472  10473 -10474  712 -10475 0
 10472  10473 -10474  712 -10476 0
 10472  10473 -10474  712 -10477 0

c  0-1 --> -1
c    (-b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧ -p_712) -> ( b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0)
c  in CNF:
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨  b^{8, 90}_2
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_1
c     b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨  b^{8, 90}_0
c  in DIMACS:
 10472  10473  10474  712  10475 0
 10472  10473  10474  712 -10476 0
 10472  10473  10474  712  10477 0

c  -1-1 --> -2
c    ( b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧  b^{8, 89}_0 ∧ -p_712) -> ( b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0)
c  in CNF:
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨  b^{8, 90}_2
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨  b^{8, 90}_1
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨  p_712 ∨ -b^{8, 90}_0
c  in DIMACS:
-10472  10473 -10474  712  10475 0
-10472  10473 -10474  712  10476 0
-10472  10473 -10474  712 -10477 0

c  -2-1 --> break 
c    ( b^{8, 89}_2 ∧  b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨  b^{8, 89}_0 ∨  p_712 ∨ break
c  in DIMACS:
-10472 -10473  10474  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 89}_2 ∧ -b^{8, 89}_1 ∧ -b^{8, 89}_0 ∧ true) 
c  in CNF:
c    -b^{8, 89}_2 ∨  b^{8, 89}_1 ∨  b^{8, 89}_0 ∨ false 
c  in DIMACS:
-10472  10473  10474  0

c  3 does not represent an automaton state.
c    -(-b^{8, 89}_2 ∧  b^{8, 89}_1 ∧  b^{8, 89}_0 ∧ true) 
c  in CNF:
c     b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ false 
c  in DIMACS:
 10472 -10473 -10474  0
c  -3 does not represent an automaton state.
c    -( b^{8, 89}_2 ∧  b^{8, 89}_1 ∧  b^{8, 89}_0 ∧ true) 
c  in CNF:
c    -b^{8, 89}_2 ∨ -b^{8, 89}_1 ∨ -b^{8, 89}_0 ∨ false 
c  in DIMACS:
-10472 -10473 -10474  0

c i = 90
c  -2+1 --> -1
c    ( b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧  p_720) -> ( b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0)
c  in CNF:
c    -b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨  b^{8, 91}_2
c    -b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_1
c    -b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨  b^{8, 91}_0
c  in DIMACS:
-10475 -10476  10477 -720  10478 0
-10475 -10476  10477 -720 -10479 0
-10475 -10476  10477 -720  10480 0

c  -1+1 --> 0
c    ( b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0 ∧  p_720) -> (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧ -b^{8, 91}_0)
c  in CNF:
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_2
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_1
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_0
c  in DIMACS:
-10475  10476 -10477 -720 -10478 0
-10475  10476 -10477 -720 -10479 0
-10475  10476 -10477 -720 -10480 0

c  0+1 --> 1
c    (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧  p_720) -> (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0)
c  in CNF:
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_2
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_1
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨  b^{8, 91}_0
c  in DIMACS:
 10475  10476  10477 -720 -10478 0
 10475  10476  10477 -720 -10479 0
 10475  10476  10477 -720  10480 0

c  1+1 --> 2
c    (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0 ∧  p_720) -> (-b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0)
c  in CNF:
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_2
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨  b^{8, 91}_1
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ -p_720 ∨ -b^{8, 91}_0
c  in DIMACS:
 10475  10476 -10477 -720 -10478 0
 10475  10476 -10477 -720  10479 0
 10475  10476 -10477 -720 -10480 0

c  2+1 --> break 
c    (-b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧  p_720) -> break
c  in CNF:
c     b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 10475 -10476  10477 -720 1162 0


c  2-1 --> 1
c    (-b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧ -p_720) -> (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0)
c  in CNF:
c     b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_2
c     b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_1
c     b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨  b^{8, 91}_0
c  in DIMACS:
 10475 -10476  10477  720 -10478 0
 10475 -10476  10477  720 -10479 0
 10475 -10476  10477  720  10480 0

c  1-1 --> 0
c    (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0 ∧ -p_720) -> (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧ -b^{8, 91}_0)
c  in CNF:
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_2
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_1
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_0
c  in DIMACS:
 10475  10476 -10477  720 -10478 0
 10475  10476 -10477  720 -10479 0
 10475  10476 -10477  720 -10480 0

c  0-1 --> -1
c    (-b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧ -p_720) -> ( b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0)
c  in CNF:
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨  b^{8, 91}_2
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_1
c     b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨  b^{8, 91}_0
c  in DIMACS:
 10475  10476  10477  720  10478 0
 10475  10476  10477  720 -10479 0
 10475  10476  10477  720  10480 0

c  -1-1 --> -2
c    ( b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧  b^{8, 90}_0 ∧ -p_720) -> ( b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0)
c  in CNF:
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨  b^{8, 91}_2
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨  b^{8, 91}_1
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨  p_720 ∨ -b^{8, 91}_0
c  in DIMACS:
-10475  10476 -10477  720  10478 0
-10475  10476 -10477  720  10479 0
-10475  10476 -10477  720 -10480 0

c  -2-1 --> break 
c    ( b^{8, 90}_2 ∧  b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨  b^{8, 90}_0 ∨  p_720 ∨ break
c  in DIMACS:
-10475 -10476  10477  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 90}_2 ∧ -b^{8, 90}_1 ∧ -b^{8, 90}_0 ∧ true) 
c  in CNF:
c    -b^{8, 90}_2 ∨  b^{8, 90}_1 ∨  b^{8, 90}_0 ∨ false 
c  in DIMACS:
-10475  10476  10477  0

c  3 does not represent an automaton state.
c    -(-b^{8, 90}_2 ∧  b^{8, 90}_1 ∧  b^{8, 90}_0 ∧ true) 
c  in CNF:
c     b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ false 
c  in DIMACS:
 10475 -10476 -10477  0
c  -3 does not represent an automaton state.
c    -( b^{8, 90}_2 ∧  b^{8, 90}_1 ∧  b^{8, 90}_0 ∧ true) 
c  in CNF:
c    -b^{8, 90}_2 ∨ -b^{8, 90}_1 ∨ -b^{8, 90}_0 ∨ false 
c  in DIMACS:
-10475 -10476 -10477  0

c i = 91
c  -2+1 --> -1
c    ( b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧  p_728) -> ( b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0)
c  in CNF:
c    -b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨  b^{8, 92}_2
c    -b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_1
c    -b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨  b^{8, 92}_0
c  in DIMACS:
-10478 -10479  10480 -728  10481 0
-10478 -10479  10480 -728 -10482 0
-10478 -10479  10480 -728  10483 0

c  -1+1 --> 0
c    ( b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0 ∧  p_728) -> (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧ -b^{8, 92}_0)
c  in CNF:
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_2
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_1
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_0
c  in DIMACS:
-10478  10479 -10480 -728 -10481 0
-10478  10479 -10480 -728 -10482 0
-10478  10479 -10480 -728 -10483 0

c  0+1 --> 1
c    (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧  p_728) -> (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0)
c  in CNF:
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_2
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_1
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨  b^{8, 92}_0
c  in DIMACS:
 10478  10479  10480 -728 -10481 0
 10478  10479  10480 -728 -10482 0
 10478  10479  10480 -728  10483 0

c  1+1 --> 2
c    (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0 ∧  p_728) -> (-b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0)
c  in CNF:
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_2
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨  b^{8, 92}_1
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ -p_728 ∨ -b^{8, 92}_0
c  in DIMACS:
 10478  10479 -10480 -728 -10481 0
 10478  10479 -10480 -728  10482 0
 10478  10479 -10480 -728 -10483 0

c  2+1 --> break 
c    (-b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧  p_728) -> break
c  in CNF:
c     b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 10478 -10479  10480 -728 1162 0


c  2-1 --> 1
c    (-b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧ -p_728) -> (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0)
c  in CNF:
c     b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_2
c     b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_1
c     b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨  b^{8, 92}_0
c  in DIMACS:
 10478 -10479  10480  728 -10481 0
 10478 -10479  10480  728 -10482 0
 10478 -10479  10480  728  10483 0

c  1-1 --> 0
c    (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0 ∧ -p_728) -> (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧ -b^{8, 92}_0)
c  in CNF:
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_2
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_1
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_0
c  in DIMACS:
 10478  10479 -10480  728 -10481 0
 10478  10479 -10480  728 -10482 0
 10478  10479 -10480  728 -10483 0

c  0-1 --> -1
c    (-b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧ -p_728) -> ( b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0)
c  in CNF:
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨  b^{8, 92}_2
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_1
c     b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨  b^{8, 92}_0
c  in DIMACS:
 10478  10479  10480  728  10481 0
 10478  10479  10480  728 -10482 0
 10478  10479  10480  728  10483 0

c  -1-1 --> -2
c    ( b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧  b^{8, 91}_0 ∧ -p_728) -> ( b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0)
c  in CNF:
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨  b^{8, 92}_2
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨  b^{8, 92}_1
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨  p_728 ∨ -b^{8, 92}_0
c  in DIMACS:
-10478  10479 -10480  728  10481 0
-10478  10479 -10480  728  10482 0
-10478  10479 -10480  728 -10483 0

c  -2-1 --> break 
c    ( b^{8, 91}_2 ∧  b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨  b^{8, 91}_0 ∨  p_728 ∨ break
c  in DIMACS:
-10478 -10479  10480  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 91}_2 ∧ -b^{8, 91}_1 ∧ -b^{8, 91}_0 ∧ true) 
c  in CNF:
c    -b^{8, 91}_2 ∨  b^{8, 91}_1 ∨  b^{8, 91}_0 ∨ false 
c  in DIMACS:
-10478  10479  10480  0

c  3 does not represent an automaton state.
c    -(-b^{8, 91}_2 ∧  b^{8, 91}_1 ∧  b^{8, 91}_0 ∧ true) 
c  in CNF:
c     b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ false 
c  in DIMACS:
 10478 -10479 -10480  0
c  -3 does not represent an automaton state.
c    -( b^{8, 91}_2 ∧  b^{8, 91}_1 ∧  b^{8, 91}_0 ∧ true) 
c  in CNF:
c    -b^{8, 91}_2 ∨ -b^{8, 91}_1 ∨ -b^{8, 91}_0 ∨ false 
c  in DIMACS:
-10478 -10479 -10480  0

c i = 92
c  -2+1 --> -1
c    ( b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧  p_736) -> ( b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0)
c  in CNF:
c    -b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨  b^{8, 93}_2
c    -b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_1
c    -b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨  b^{8, 93}_0
c  in DIMACS:
-10481 -10482  10483 -736  10484 0
-10481 -10482  10483 -736 -10485 0
-10481 -10482  10483 -736  10486 0

c  -1+1 --> 0
c    ( b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0 ∧  p_736) -> (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧ -b^{8, 93}_0)
c  in CNF:
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_2
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_1
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_0
c  in DIMACS:
-10481  10482 -10483 -736 -10484 0
-10481  10482 -10483 -736 -10485 0
-10481  10482 -10483 -736 -10486 0

c  0+1 --> 1
c    (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧  p_736) -> (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0)
c  in CNF:
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_2
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_1
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨  b^{8, 93}_0
c  in DIMACS:
 10481  10482  10483 -736 -10484 0
 10481  10482  10483 -736 -10485 0
 10481  10482  10483 -736  10486 0

c  1+1 --> 2
c    (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0 ∧  p_736) -> (-b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0)
c  in CNF:
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_2
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨  b^{8, 93}_1
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ -p_736 ∨ -b^{8, 93}_0
c  in DIMACS:
 10481  10482 -10483 -736 -10484 0
 10481  10482 -10483 -736  10485 0
 10481  10482 -10483 -736 -10486 0

c  2+1 --> break 
c    (-b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧  p_736) -> break
c  in CNF:
c     b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 10481 -10482  10483 -736 1162 0


c  2-1 --> 1
c    (-b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧ -p_736) -> (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0)
c  in CNF:
c     b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_2
c     b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_1
c     b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨  b^{8, 93}_0
c  in DIMACS:
 10481 -10482  10483  736 -10484 0
 10481 -10482  10483  736 -10485 0
 10481 -10482  10483  736  10486 0

c  1-1 --> 0
c    (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0 ∧ -p_736) -> (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧ -b^{8, 93}_0)
c  in CNF:
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_2
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_1
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_0
c  in DIMACS:
 10481  10482 -10483  736 -10484 0
 10481  10482 -10483  736 -10485 0
 10481  10482 -10483  736 -10486 0

c  0-1 --> -1
c    (-b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧ -p_736) -> ( b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0)
c  in CNF:
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨  b^{8, 93}_2
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_1
c     b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨  b^{8, 93}_0
c  in DIMACS:
 10481  10482  10483  736  10484 0
 10481  10482  10483  736 -10485 0
 10481  10482  10483  736  10486 0

c  -1-1 --> -2
c    ( b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧  b^{8, 92}_0 ∧ -p_736) -> ( b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0)
c  in CNF:
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨  b^{8, 93}_2
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨  b^{8, 93}_1
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨  p_736 ∨ -b^{8, 93}_0
c  in DIMACS:
-10481  10482 -10483  736  10484 0
-10481  10482 -10483  736  10485 0
-10481  10482 -10483  736 -10486 0

c  -2-1 --> break 
c    ( b^{8, 92}_2 ∧  b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨  b^{8, 92}_0 ∨  p_736 ∨ break
c  in DIMACS:
-10481 -10482  10483  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 92}_2 ∧ -b^{8, 92}_1 ∧ -b^{8, 92}_0 ∧ true) 
c  in CNF:
c    -b^{8, 92}_2 ∨  b^{8, 92}_1 ∨  b^{8, 92}_0 ∨ false 
c  in DIMACS:
-10481  10482  10483  0

c  3 does not represent an automaton state.
c    -(-b^{8, 92}_2 ∧  b^{8, 92}_1 ∧  b^{8, 92}_0 ∧ true) 
c  in CNF:
c     b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ false 
c  in DIMACS:
 10481 -10482 -10483  0
c  -3 does not represent an automaton state.
c    -( b^{8, 92}_2 ∧  b^{8, 92}_1 ∧  b^{8, 92}_0 ∧ true) 
c  in CNF:
c    -b^{8, 92}_2 ∨ -b^{8, 92}_1 ∨ -b^{8, 92}_0 ∨ false 
c  in DIMACS:
-10481 -10482 -10483  0

c i = 93
c  -2+1 --> -1
c    ( b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧  p_744) -> ( b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0)
c  in CNF:
c    -b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨  b^{8, 94}_2
c    -b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_1
c    -b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨  b^{8, 94}_0
c  in DIMACS:
-10484 -10485  10486 -744  10487 0
-10484 -10485  10486 -744 -10488 0
-10484 -10485  10486 -744  10489 0

c  -1+1 --> 0
c    ( b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0 ∧  p_744) -> (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧ -b^{8, 94}_0)
c  in CNF:
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_2
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_1
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_0
c  in DIMACS:
-10484  10485 -10486 -744 -10487 0
-10484  10485 -10486 -744 -10488 0
-10484  10485 -10486 -744 -10489 0

c  0+1 --> 1
c    (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧  p_744) -> (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0)
c  in CNF:
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_2
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_1
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨  b^{8, 94}_0
c  in DIMACS:
 10484  10485  10486 -744 -10487 0
 10484  10485  10486 -744 -10488 0
 10484  10485  10486 -744  10489 0

c  1+1 --> 2
c    (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0 ∧  p_744) -> (-b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0)
c  in CNF:
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_2
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨  b^{8, 94}_1
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ -p_744 ∨ -b^{8, 94}_0
c  in DIMACS:
 10484  10485 -10486 -744 -10487 0
 10484  10485 -10486 -744  10488 0
 10484  10485 -10486 -744 -10489 0

c  2+1 --> break 
c    (-b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧  p_744) -> break
c  in CNF:
c     b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 10484 -10485  10486 -744 1162 0


c  2-1 --> 1
c    (-b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧ -p_744) -> (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0)
c  in CNF:
c     b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_2
c     b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_1
c     b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨  b^{8, 94}_0
c  in DIMACS:
 10484 -10485  10486  744 -10487 0
 10484 -10485  10486  744 -10488 0
 10484 -10485  10486  744  10489 0

c  1-1 --> 0
c    (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0 ∧ -p_744) -> (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧ -b^{8, 94}_0)
c  in CNF:
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_2
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_1
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_0
c  in DIMACS:
 10484  10485 -10486  744 -10487 0
 10484  10485 -10486  744 -10488 0
 10484  10485 -10486  744 -10489 0

c  0-1 --> -1
c    (-b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧ -p_744) -> ( b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0)
c  in CNF:
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨  b^{8, 94}_2
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_1
c     b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨  b^{8, 94}_0
c  in DIMACS:
 10484  10485  10486  744  10487 0
 10484  10485  10486  744 -10488 0
 10484  10485  10486  744  10489 0

c  -1-1 --> -2
c    ( b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧  b^{8, 93}_0 ∧ -p_744) -> ( b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0)
c  in CNF:
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨  b^{8, 94}_2
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨  b^{8, 94}_1
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨  p_744 ∨ -b^{8, 94}_0
c  in DIMACS:
-10484  10485 -10486  744  10487 0
-10484  10485 -10486  744  10488 0
-10484  10485 -10486  744 -10489 0

c  -2-1 --> break 
c    ( b^{8, 93}_2 ∧  b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨  b^{8, 93}_0 ∨  p_744 ∨ break
c  in DIMACS:
-10484 -10485  10486  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 93}_2 ∧ -b^{8, 93}_1 ∧ -b^{8, 93}_0 ∧ true) 
c  in CNF:
c    -b^{8, 93}_2 ∨  b^{8, 93}_1 ∨  b^{8, 93}_0 ∨ false 
c  in DIMACS:
-10484  10485  10486  0

c  3 does not represent an automaton state.
c    -(-b^{8, 93}_2 ∧  b^{8, 93}_1 ∧  b^{8, 93}_0 ∧ true) 
c  in CNF:
c     b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ false 
c  in DIMACS:
 10484 -10485 -10486  0
c  -3 does not represent an automaton state.
c    -( b^{8, 93}_2 ∧  b^{8, 93}_1 ∧  b^{8, 93}_0 ∧ true) 
c  in CNF:
c    -b^{8, 93}_2 ∨ -b^{8, 93}_1 ∨ -b^{8, 93}_0 ∨ false 
c  in DIMACS:
-10484 -10485 -10486  0

c i = 94
c  -2+1 --> -1
c    ( b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧  p_752) -> ( b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0)
c  in CNF:
c    -b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨  b^{8, 95}_2
c    -b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_1
c    -b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨  b^{8, 95}_0
c  in DIMACS:
-10487 -10488  10489 -752  10490 0
-10487 -10488  10489 -752 -10491 0
-10487 -10488  10489 -752  10492 0

c  -1+1 --> 0
c    ( b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0 ∧  p_752) -> (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧ -b^{8, 95}_0)
c  in CNF:
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_2
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_1
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_0
c  in DIMACS:
-10487  10488 -10489 -752 -10490 0
-10487  10488 -10489 -752 -10491 0
-10487  10488 -10489 -752 -10492 0

c  0+1 --> 1
c    (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧  p_752) -> (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0)
c  in CNF:
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_2
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_1
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨  b^{8, 95}_0
c  in DIMACS:
 10487  10488  10489 -752 -10490 0
 10487  10488  10489 -752 -10491 0
 10487  10488  10489 -752  10492 0

c  1+1 --> 2
c    (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0 ∧  p_752) -> (-b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0)
c  in CNF:
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_2
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨  b^{8, 95}_1
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ -p_752 ∨ -b^{8, 95}_0
c  in DIMACS:
 10487  10488 -10489 -752 -10490 0
 10487  10488 -10489 -752  10491 0
 10487  10488 -10489 -752 -10492 0

c  2+1 --> break 
c    (-b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧  p_752) -> break
c  in CNF:
c     b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 10487 -10488  10489 -752 1162 0


c  2-1 --> 1
c    (-b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧ -p_752) -> (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0)
c  in CNF:
c     b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_2
c     b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_1
c     b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨  b^{8, 95}_0
c  in DIMACS:
 10487 -10488  10489  752 -10490 0
 10487 -10488  10489  752 -10491 0
 10487 -10488  10489  752  10492 0

c  1-1 --> 0
c    (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0 ∧ -p_752) -> (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧ -b^{8, 95}_0)
c  in CNF:
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_2
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_1
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_0
c  in DIMACS:
 10487  10488 -10489  752 -10490 0
 10487  10488 -10489  752 -10491 0
 10487  10488 -10489  752 -10492 0

c  0-1 --> -1
c    (-b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧ -p_752) -> ( b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0)
c  in CNF:
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨  b^{8, 95}_2
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_1
c     b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨  b^{8, 95}_0
c  in DIMACS:
 10487  10488  10489  752  10490 0
 10487  10488  10489  752 -10491 0
 10487  10488  10489  752  10492 0

c  -1-1 --> -2
c    ( b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧  b^{8, 94}_0 ∧ -p_752) -> ( b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0)
c  in CNF:
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨  b^{8, 95}_2
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨  b^{8, 95}_1
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨  p_752 ∨ -b^{8, 95}_0
c  in DIMACS:
-10487  10488 -10489  752  10490 0
-10487  10488 -10489  752  10491 0
-10487  10488 -10489  752 -10492 0

c  -2-1 --> break 
c    ( b^{8, 94}_2 ∧  b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨  b^{8, 94}_0 ∨  p_752 ∨ break
c  in DIMACS:
-10487 -10488  10489  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 94}_2 ∧ -b^{8, 94}_1 ∧ -b^{8, 94}_0 ∧ true) 
c  in CNF:
c    -b^{8, 94}_2 ∨  b^{8, 94}_1 ∨  b^{8, 94}_0 ∨ false 
c  in DIMACS:
-10487  10488  10489  0

c  3 does not represent an automaton state.
c    -(-b^{8, 94}_2 ∧  b^{8, 94}_1 ∧  b^{8, 94}_0 ∧ true) 
c  in CNF:
c     b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ false 
c  in DIMACS:
 10487 -10488 -10489  0
c  -3 does not represent an automaton state.
c    -( b^{8, 94}_2 ∧  b^{8, 94}_1 ∧  b^{8, 94}_0 ∧ true) 
c  in CNF:
c    -b^{8, 94}_2 ∨ -b^{8, 94}_1 ∨ -b^{8, 94}_0 ∨ false 
c  in DIMACS:
-10487 -10488 -10489  0

c i = 95
c  -2+1 --> -1
c    ( b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧  p_760) -> ( b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0)
c  in CNF:
c    -b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨  b^{8, 96}_2
c    -b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_1
c    -b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨  b^{8, 96}_0
c  in DIMACS:
-10490 -10491  10492 -760  10493 0
-10490 -10491  10492 -760 -10494 0
-10490 -10491  10492 -760  10495 0

c  -1+1 --> 0
c    ( b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0 ∧  p_760) -> (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧ -b^{8, 96}_0)
c  in CNF:
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_2
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_1
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_0
c  in DIMACS:
-10490  10491 -10492 -760 -10493 0
-10490  10491 -10492 -760 -10494 0
-10490  10491 -10492 -760 -10495 0

c  0+1 --> 1
c    (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧  p_760) -> (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0)
c  in CNF:
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_2
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_1
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨  b^{8, 96}_0
c  in DIMACS:
 10490  10491  10492 -760 -10493 0
 10490  10491  10492 -760 -10494 0
 10490  10491  10492 -760  10495 0

c  1+1 --> 2
c    (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0 ∧  p_760) -> (-b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0)
c  in CNF:
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_2
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨  b^{8, 96}_1
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ -p_760 ∨ -b^{8, 96}_0
c  in DIMACS:
 10490  10491 -10492 -760 -10493 0
 10490  10491 -10492 -760  10494 0
 10490  10491 -10492 -760 -10495 0

c  2+1 --> break 
c    (-b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧  p_760) -> break
c  in CNF:
c     b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 10490 -10491  10492 -760 1162 0


c  2-1 --> 1
c    (-b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧ -p_760) -> (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0)
c  in CNF:
c     b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_2
c     b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_1
c     b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨  b^{8, 96}_0
c  in DIMACS:
 10490 -10491  10492  760 -10493 0
 10490 -10491  10492  760 -10494 0
 10490 -10491  10492  760  10495 0

c  1-1 --> 0
c    (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0 ∧ -p_760) -> (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧ -b^{8, 96}_0)
c  in CNF:
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_2
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_1
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_0
c  in DIMACS:
 10490  10491 -10492  760 -10493 0
 10490  10491 -10492  760 -10494 0
 10490  10491 -10492  760 -10495 0

c  0-1 --> -1
c    (-b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧ -p_760) -> ( b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0)
c  in CNF:
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨  b^{8, 96}_2
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_1
c     b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨  b^{8, 96}_0
c  in DIMACS:
 10490  10491  10492  760  10493 0
 10490  10491  10492  760 -10494 0
 10490  10491  10492  760  10495 0

c  -1-1 --> -2
c    ( b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧  b^{8, 95}_0 ∧ -p_760) -> ( b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0)
c  in CNF:
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨  b^{8, 96}_2
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨  b^{8, 96}_1
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨  p_760 ∨ -b^{8, 96}_0
c  in DIMACS:
-10490  10491 -10492  760  10493 0
-10490  10491 -10492  760  10494 0
-10490  10491 -10492  760 -10495 0

c  -2-1 --> break 
c    ( b^{8, 95}_2 ∧  b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨  b^{8, 95}_0 ∨  p_760 ∨ break
c  in DIMACS:
-10490 -10491  10492  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 95}_2 ∧ -b^{8, 95}_1 ∧ -b^{8, 95}_0 ∧ true) 
c  in CNF:
c    -b^{8, 95}_2 ∨  b^{8, 95}_1 ∨  b^{8, 95}_0 ∨ false 
c  in DIMACS:
-10490  10491  10492  0

c  3 does not represent an automaton state.
c    -(-b^{8, 95}_2 ∧  b^{8, 95}_1 ∧  b^{8, 95}_0 ∧ true) 
c  in CNF:
c     b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ false 
c  in DIMACS:
 10490 -10491 -10492  0
c  -3 does not represent an automaton state.
c    -( b^{8, 95}_2 ∧  b^{8, 95}_1 ∧  b^{8, 95}_0 ∧ true) 
c  in CNF:
c    -b^{8, 95}_2 ∨ -b^{8, 95}_1 ∨ -b^{8, 95}_0 ∨ false 
c  in DIMACS:
-10490 -10491 -10492  0

c i = 96
c  -2+1 --> -1
c    ( b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧  p_768) -> ( b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0)
c  in CNF:
c    -b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨  b^{8, 97}_2
c    -b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_1
c    -b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨  b^{8, 97}_0
c  in DIMACS:
-10493 -10494  10495 -768  10496 0
-10493 -10494  10495 -768 -10497 0
-10493 -10494  10495 -768  10498 0

c  -1+1 --> 0
c    ( b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0 ∧  p_768) -> (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧ -b^{8, 97}_0)
c  in CNF:
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_2
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_1
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_0
c  in DIMACS:
-10493  10494 -10495 -768 -10496 0
-10493  10494 -10495 -768 -10497 0
-10493  10494 -10495 -768 -10498 0

c  0+1 --> 1
c    (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧  p_768) -> (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0)
c  in CNF:
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_2
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_1
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨  b^{8, 97}_0
c  in DIMACS:
 10493  10494  10495 -768 -10496 0
 10493  10494  10495 -768 -10497 0
 10493  10494  10495 -768  10498 0

c  1+1 --> 2
c    (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0 ∧  p_768) -> (-b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0)
c  in CNF:
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_2
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨  b^{8, 97}_1
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ -p_768 ∨ -b^{8, 97}_0
c  in DIMACS:
 10493  10494 -10495 -768 -10496 0
 10493  10494 -10495 -768  10497 0
 10493  10494 -10495 -768 -10498 0

c  2+1 --> break 
c    (-b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧  p_768) -> break
c  in CNF:
c     b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 10493 -10494  10495 -768 1162 0


c  2-1 --> 1
c    (-b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧ -p_768) -> (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0)
c  in CNF:
c     b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_2
c     b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_1
c     b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨  b^{8, 97}_0
c  in DIMACS:
 10493 -10494  10495  768 -10496 0
 10493 -10494  10495  768 -10497 0
 10493 -10494  10495  768  10498 0

c  1-1 --> 0
c    (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0 ∧ -p_768) -> (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧ -b^{8, 97}_0)
c  in CNF:
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_2
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_1
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_0
c  in DIMACS:
 10493  10494 -10495  768 -10496 0
 10493  10494 -10495  768 -10497 0
 10493  10494 -10495  768 -10498 0

c  0-1 --> -1
c    (-b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧ -p_768) -> ( b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0)
c  in CNF:
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨  b^{8, 97}_2
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_1
c     b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨  b^{8, 97}_0
c  in DIMACS:
 10493  10494  10495  768  10496 0
 10493  10494  10495  768 -10497 0
 10493  10494  10495  768  10498 0

c  -1-1 --> -2
c    ( b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧  b^{8, 96}_0 ∧ -p_768) -> ( b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0)
c  in CNF:
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨  b^{8, 97}_2
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨  b^{8, 97}_1
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨  p_768 ∨ -b^{8, 97}_0
c  in DIMACS:
-10493  10494 -10495  768  10496 0
-10493  10494 -10495  768  10497 0
-10493  10494 -10495  768 -10498 0

c  -2-1 --> break 
c    ( b^{8, 96}_2 ∧  b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨  b^{8, 96}_0 ∨  p_768 ∨ break
c  in DIMACS:
-10493 -10494  10495  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 96}_2 ∧ -b^{8, 96}_1 ∧ -b^{8, 96}_0 ∧ true) 
c  in CNF:
c    -b^{8, 96}_2 ∨  b^{8, 96}_1 ∨  b^{8, 96}_0 ∨ false 
c  in DIMACS:
-10493  10494  10495  0

c  3 does not represent an automaton state.
c    -(-b^{8, 96}_2 ∧  b^{8, 96}_1 ∧  b^{8, 96}_0 ∧ true) 
c  in CNF:
c     b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ false 
c  in DIMACS:
 10493 -10494 -10495  0
c  -3 does not represent an automaton state.
c    -( b^{8, 96}_2 ∧  b^{8, 96}_1 ∧  b^{8, 96}_0 ∧ true) 
c  in CNF:
c    -b^{8, 96}_2 ∨ -b^{8, 96}_1 ∨ -b^{8, 96}_0 ∨ false 
c  in DIMACS:
-10493 -10494 -10495  0

c i = 97
c  -2+1 --> -1
c    ( b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧  p_776) -> ( b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0)
c  in CNF:
c    -b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨  b^{8, 98}_2
c    -b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_1
c    -b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨  b^{8, 98}_0
c  in DIMACS:
-10496 -10497  10498 -776  10499 0
-10496 -10497  10498 -776 -10500 0
-10496 -10497  10498 -776  10501 0

c  -1+1 --> 0
c    ( b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0 ∧  p_776) -> (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧ -b^{8, 98}_0)
c  in CNF:
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_2
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_1
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_0
c  in DIMACS:
-10496  10497 -10498 -776 -10499 0
-10496  10497 -10498 -776 -10500 0
-10496  10497 -10498 -776 -10501 0

c  0+1 --> 1
c    (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧  p_776) -> (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0)
c  in CNF:
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_2
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_1
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨  b^{8, 98}_0
c  in DIMACS:
 10496  10497  10498 -776 -10499 0
 10496  10497  10498 -776 -10500 0
 10496  10497  10498 -776  10501 0

c  1+1 --> 2
c    (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0 ∧  p_776) -> (-b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0)
c  in CNF:
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_2
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨  b^{8, 98}_1
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ -p_776 ∨ -b^{8, 98}_0
c  in DIMACS:
 10496  10497 -10498 -776 -10499 0
 10496  10497 -10498 -776  10500 0
 10496  10497 -10498 -776 -10501 0

c  2+1 --> break 
c    (-b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧  p_776) -> break
c  in CNF:
c     b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 10496 -10497  10498 -776 1162 0


c  2-1 --> 1
c    (-b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧ -p_776) -> (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0)
c  in CNF:
c     b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_2
c     b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_1
c     b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨  b^{8, 98}_0
c  in DIMACS:
 10496 -10497  10498  776 -10499 0
 10496 -10497  10498  776 -10500 0
 10496 -10497  10498  776  10501 0

c  1-1 --> 0
c    (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0 ∧ -p_776) -> (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧ -b^{8, 98}_0)
c  in CNF:
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_2
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_1
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_0
c  in DIMACS:
 10496  10497 -10498  776 -10499 0
 10496  10497 -10498  776 -10500 0
 10496  10497 -10498  776 -10501 0

c  0-1 --> -1
c    (-b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧ -p_776) -> ( b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0)
c  in CNF:
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨  b^{8, 98}_2
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_1
c     b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨  b^{8, 98}_0
c  in DIMACS:
 10496  10497  10498  776  10499 0
 10496  10497  10498  776 -10500 0
 10496  10497  10498  776  10501 0

c  -1-1 --> -2
c    ( b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧  b^{8, 97}_0 ∧ -p_776) -> ( b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0)
c  in CNF:
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨  b^{8, 98}_2
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨  b^{8, 98}_1
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨  p_776 ∨ -b^{8, 98}_0
c  in DIMACS:
-10496  10497 -10498  776  10499 0
-10496  10497 -10498  776  10500 0
-10496  10497 -10498  776 -10501 0

c  -2-1 --> break 
c    ( b^{8, 97}_2 ∧  b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨  b^{8, 97}_0 ∨  p_776 ∨ break
c  in DIMACS:
-10496 -10497  10498  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 97}_2 ∧ -b^{8, 97}_1 ∧ -b^{8, 97}_0 ∧ true) 
c  in CNF:
c    -b^{8, 97}_2 ∨  b^{8, 97}_1 ∨  b^{8, 97}_0 ∨ false 
c  in DIMACS:
-10496  10497  10498  0

c  3 does not represent an automaton state.
c    -(-b^{8, 97}_2 ∧  b^{8, 97}_1 ∧  b^{8, 97}_0 ∧ true) 
c  in CNF:
c     b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ false 
c  in DIMACS:
 10496 -10497 -10498  0
c  -3 does not represent an automaton state.
c    -( b^{8, 97}_2 ∧  b^{8, 97}_1 ∧  b^{8, 97}_0 ∧ true) 
c  in CNF:
c    -b^{8, 97}_2 ∨ -b^{8, 97}_1 ∨ -b^{8, 97}_0 ∨ false 
c  in DIMACS:
-10496 -10497 -10498  0

c i = 98
c  -2+1 --> -1
c    ( b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧  p_784) -> ( b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0)
c  in CNF:
c    -b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨  b^{8, 99}_2
c    -b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_1
c    -b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨  b^{8, 99}_0
c  in DIMACS:
-10499 -10500  10501 -784  10502 0
-10499 -10500  10501 -784 -10503 0
-10499 -10500  10501 -784  10504 0

c  -1+1 --> 0
c    ( b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0 ∧  p_784) -> (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧ -b^{8, 99}_0)
c  in CNF:
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_2
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_1
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_0
c  in DIMACS:
-10499  10500 -10501 -784 -10502 0
-10499  10500 -10501 -784 -10503 0
-10499  10500 -10501 -784 -10504 0

c  0+1 --> 1
c    (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧  p_784) -> (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0)
c  in CNF:
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_2
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_1
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨  b^{8, 99}_0
c  in DIMACS:
 10499  10500  10501 -784 -10502 0
 10499  10500  10501 -784 -10503 0
 10499  10500  10501 -784  10504 0

c  1+1 --> 2
c    (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0 ∧  p_784) -> (-b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0)
c  in CNF:
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_2
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨  b^{8, 99}_1
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ -p_784 ∨ -b^{8, 99}_0
c  in DIMACS:
 10499  10500 -10501 -784 -10502 0
 10499  10500 -10501 -784  10503 0
 10499  10500 -10501 -784 -10504 0

c  2+1 --> break 
c    (-b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧  p_784) -> break
c  in CNF:
c     b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 10499 -10500  10501 -784 1162 0


c  2-1 --> 1
c    (-b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧ -p_784) -> (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0)
c  in CNF:
c     b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_2
c     b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_1
c     b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨  b^{8, 99}_0
c  in DIMACS:
 10499 -10500  10501  784 -10502 0
 10499 -10500  10501  784 -10503 0
 10499 -10500  10501  784  10504 0

c  1-1 --> 0
c    (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0 ∧ -p_784) -> (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧ -b^{8, 99}_0)
c  in CNF:
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_2
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_1
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_0
c  in DIMACS:
 10499  10500 -10501  784 -10502 0
 10499  10500 -10501  784 -10503 0
 10499  10500 -10501  784 -10504 0

c  0-1 --> -1
c    (-b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧ -p_784) -> ( b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0)
c  in CNF:
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨  b^{8, 99}_2
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_1
c     b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨  b^{8, 99}_0
c  in DIMACS:
 10499  10500  10501  784  10502 0
 10499  10500  10501  784 -10503 0
 10499  10500  10501  784  10504 0

c  -1-1 --> -2
c    ( b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧  b^{8, 98}_0 ∧ -p_784) -> ( b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0)
c  in CNF:
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨  b^{8, 99}_2
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨  b^{8, 99}_1
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨  p_784 ∨ -b^{8, 99}_0
c  in DIMACS:
-10499  10500 -10501  784  10502 0
-10499  10500 -10501  784  10503 0
-10499  10500 -10501  784 -10504 0

c  -2-1 --> break 
c    ( b^{8, 98}_2 ∧  b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨  b^{8, 98}_0 ∨  p_784 ∨ break
c  in DIMACS:
-10499 -10500  10501  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 98}_2 ∧ -b^{8, 98}_1 ∧ -b^{8, 98}_0 ∧ true) 
c  in CNF:
c    -b^{8, 98}_2 ∨  b^{8, 98}_1 ∨  b^{8, 98}_0 ∨ false 
c  in DIMACS:
-10499  10500  10501  0

c  3 does not represent an automaton state.
c    -(-b^{8, 98}_2 ∧  b^{8, 98}_1 ∧  b^{8, 98}_0 ∧ true) 
c  in CNF:
c     b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ false 
c  in DIMACS:
 10499 -10500 -10501  0
c  -3 does not represent an automaton state.
c    -( b^{8, 98}_2 ∧  b^{8, 98}_1 ∧  b^{8, 98}_0 ∧ true) 
c  in CNF:
c    -b^{8, 98}_2 ∨ -b^{8, 98}_1 ∨ -b^{8, 98}_0 ∨ false 
c  in DIMACS:
-10499 -10500 -10501  0

c i = 99
c  -2+1 --> -1
c    ( b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧  p_792) -> ( b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0)
c  in CNF:
c    -b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨  b^{8, 100}_2
c    -b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_1
c    -b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨  b^{8, 100}_0
c  in DIMACS:
-10502 -10503  10504 -792  10505 0
-10502 -10503  10504 -792 -10506 0
-10502 -10503  10504 -792  10507 0

c  -1+1 --> 0
c    ( b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0 ∧  p_792) -> (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧ -b^{8, 100}_0)
c  in CNF:
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_2
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_1
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_0
c  in DIMACS:
-10502  10503 -10504 -792 -10505 0
-10502  10503 -10504 -792 -10506 0
-10502  10503 -10504 -792 -10507 0

c  0+1 --> 1
c    (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧  p_792) -> (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0)
c  in CNF:
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_2
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_1
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨  b^{8, 100}_0
c  in DIMACS:
 10502  10503  10504 -792 -10505 0
 10502  10503  10504 -792 -10506 0
 10502  10503  10504 -792  10507 0

c  1+1 --> 2
c    (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0 ∧  p_792) -> (-b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0)
c  in CNF:
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_2
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨  b^{8, 100}_1
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ -p_792 ∨ -b^{8, 100}_0
c  in DIMACS:
 10502  10503 -10504 -792 -10505 0
 10502  10503 -10504 -792  10506 0
 10502  10503 -10504 -792 -10507 0

c  2+1 --> break 
c    (-b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧  p_792) -> break
c  in CNF:
c     b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 10502 -10503  10504 -792 1162 0


c  2-1 --> 1
c    (-b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧ -p_792) -> (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0)
c  in CNF:
c     b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_2
c     b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_1
c     b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨  b^{8, 100}_0
c  in DIMACS:
 10502 -10503  10504  792 -10505 0
 10502 -10503  10504  792 -10506 0
 10502 -10503  10504  792  10507 0

c  1-1 --> 0
c    (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0 ∧ -p_792) -> (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧ -b^{8, 100}_0)
c  in CNF:
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_2
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_1
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_0
c  in DIMACS:
 10502  10503 -10504  792 -10505 0
 10502  10503 -10504  792 -10506 0
 10502  10503 -10504  792 -10507 0

c  0-1 --> -1
c    (-b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧ -p_792) -> ( b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0)
c  in CNF:
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨  b^{8, 100}_2
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_1
c     b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨  b^{8, 100}_0
c  in DIMACS:
 10502  10503  10504  792  10505 0
 10502  10503  10504  792 -10506 0
 10502  10503  10504  792  10507 0

c  -1-1 --> -2
c    ( b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧  b^{8, 99}_0 ∧ -p_792) -> ( b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0)
c  in CNF:
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨  b^{8, 100}_2
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨  b^{8, 100}_1
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨  p_792 ∨ -b^{8, 100}_0
c  in DIMACS:
-10502  10503 -10504  792  10505 0
-10502  10503 -10504  792  10506 0
-10502  10503 -10504  792 -10507 0

c  -2-1 --> break 
c    ( b^{8, 99}_2 ∧  b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨  b^{8, 99}_0 ∨  p_792 ∨ break
c  in DIMACS:
-10502 -10503  10504  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 99}_2 ∧ -b^{8, 99}_1 ∧ -b^{8, 99}_0 ∧ true) 
c  in CNF:
c    -b^{8, 99}_2 ∨  b^{8, 99}_1 ∨  b^{8, 99}_0 ∨ false 
c  in DIMACS:
-10502  10503  10504  0

c  3 does not represent an automaton state.
c    -(-b^{8, 99}_2 ∧  b^{8, 99}_1 ∧  b^{8, 99}_0 ∧ true) 
c  in CNF:
c     b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ false 
c  in DIMACS:
 10502 -10503 -10504  0
c  -3 does not represent an automaton state.
c    -( b^{8, 99}_2 ∧  b^{8, 99}_1 ∧  b^{8, 99}_0 ∧ true) 
c  in CNF:
c    -b^{8, 99}_2 ∨ -b^{8, 99}_1 ∨ -b^{8, 99}_0 ∨ false 
c  in DIMACS:
-10502 -10503 -10504  0

c i = 100
c  -2+1 --> -1
c    ( b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧  p_800) -> ( b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0)
c  in CNF:
c    -b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨  b^{8, 101}_2
c    -b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_1
c    -b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨  b^{8, 101}_0
c  in DIMACS:
-10505 -10506  10507 -800  10508 0
-10505 -10506  10507 -800 -10509 0
-10505 -10506  10507 -800  10510 0

c  -1+1 --> 0
c    ( b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0 ∧  p_800) -> (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧ -b^{8, 101}_0)
c  in CNF:
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_2
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_1
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_0
c  in DIMACS:
-10505  10506 -10507 -800 -10508 0
-10505  10506 -10507 -800 -10509 0
-10505  10506 -10507 -800 -10510 0

c  0+1 --> 1
c    (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧  p_800) -> (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0)
c  in CNF:
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_2
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_1
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨  b^{8, 101}_0
c  in DIMACS:
 10505  10506  10507 -800 -10508 0
 10505  10506  10507 -800 -10509 0
 10505  10506  10507 -800  10510 0

c  1+1 --> 2
c    (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0 ∧  p_800) -> (-b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0)
c  in CNF:
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_2
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨  b^{8, 101}_1
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ -p_800 ∨ -b^{8, 101}_0
c  in DIMACS:
 10505  10506 -10507 -800 -10508 0
 10505  10506 -10507 -800  10509 0
 10505  10506 -10507 -800 -10510 0

c  2+1 --> break 
c    (-b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧  p_800) -> break
c  in CNF:
c     b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 10505 -10506  10507 -800 1162 0


c  2-1 --> 1
c    (-b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧ -p_800) -> (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0)
c  in CNF:
c     b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_2
c     b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_1
c     b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨  b^{8, 101}_0
c  in DIMACS:
 10505 -10506  10507  800 -10508 0
 10505 -10506  10507  800 -10509 0
 10505 -10506  10507  800  10510 0

c  1-1 --> 0
c    (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0 ∧ -p_800) -> (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧ -b^{8, 101}_0)
c  in CNF:
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_2
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_1
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_0
c  in DIMACS:
 10505  10506 -10507  800 -10508 0
 10505  10506 -10507  800 -10509 0
 10505  10506 -10507  800 -10510 0

c  0-1 --> -1
c    (-b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧ -p_800) -> ( b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0)
c  in CNF:
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨  b^{8, 101}_2
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_1
c     b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨  b^{8, 101}_0
c  in DIMACS:
 10505  10506  10507  800  10508 0
 10505  10506  10507  800 -10509 0
 10505  10506  10507  800  10510 0

c  -1-1 --> -2
c    ( b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧  b^{8, 100}_0 ∧ -p_800) -> ( b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0)
c  in CNF:
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨  b^{8, 101}_2
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨  b^{8, 101}_1
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨  p_800 ∨ -b^{8, 101}_0
c  in DIMACS:
-10505  10506 -10507  800  10508 0
-10505  10506 -10507  800  10509 0
-10505  10506 -10507  800 -10510 0

c  -2-1 --> break 
c    ( b^{8, 100}_2 ∧  b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨  b^{8, 100}_0 ∨  p_800 ∨ break
c  in DIMACS:
-10505 -10506  10507  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 100}_2 ∧ -b^{8, 100}_1 ∧ -b^{8, 100}_0 ∧ true) 
c  in CNF:
c    -b^{8, 100}_2 ∨  b^{8, 100}_1 ∨  b^{8, 100}_0 ∨ false 
c  in DIMACS:
-10505  10506  10507  0

c  3 does not represent an automaton state.
c    -(-b^{8, 100}_2 ∧  b^{8, 100}_1 ∧  b^{8, 100}_0 ∧ true) 
c  in CNF:
c     b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ false 
c  in DIMACS:
 10505 -10506 -10507  0
c  -3 does not represent an automaton state.
c    -( b^{8, 100}_2 ∧  b^{8, 100}_1 ∧  b^{8, 100}_0 ∧ true) 
c  in CNF:
c    -b^{8, 100}_2 ∨ -b^{8, 100}_1 ∨ -b^{8, 100}_0 ∨ false 
c  in DIMACS:
-10505 -10506 -10507  0

c i = 101
c  -2+1 --> -1
c    ( b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧  p_808) -> ( b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0)
c  in CNF:
c    -b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨  b^{8, 102}_2
c    -b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_1
c    -b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨  b^{8, 102}_0
c  in DIMACS:
-10508 -10509  10510 -808  10511 0
-10508 -10509  10510 -808 -10512 0
-10508 -10509  10510 -808  10513 0

c  -1+1 --> 0
c    ( b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0 ∧  p_808) -> (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧ -b^{8, 102}_0)
c  in CNF:
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_2
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_1
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_0
c  in DIMACS:
-10508  10509 -10510 -808 -10511 0
-10508  10509 -10510 -808 -10512 0
-10508  10509 -10510 -808 -10513 0

c  0+1 --> 1
c    (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧  p_808) -> (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0)
c  in CNF:
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_2
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_1
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨  b^{8, 102}_0
c  in DIMACS:
 10508  10509  10510 -808 -10511 0
 10508  10509  10510 -808 -10512 0
 10508  10509  10510 -808  10513 0

c  1+1 --> 2
c    (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0 ∧  p_808) -> (-b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0)
c  in CNF:
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_2
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨  b^{8, 102}_1
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ -p_808 ∨ -b^{8, 102}_0
c  in DIMACS:
 10508  10509 -10510 -808 -10511 0
 10508  10509 -10510 -808  10512 0
 10508  10509 -10510 -808 -10513 0

c  2+1 --> break 
c    (-b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧  p_808) -> break
c  in CNF:
c     b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 10508 -10509  10510 -808 1162 0


c  2-1 --> 1
c    (-b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧ -p_808) -> (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0)
c  in CNF:
c     b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_2
c     b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_1
c     b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨  b^{8, 102}_0
c  in DIMACS:
 10508 -10509  10510  808 -10511 0
 10508 -10509  10510  808 -10512 0
 10508 -10509  10510  808  10513 0

c  1-1 --> 0
c    (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0 ∧ -p_808) -> (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧ -b^{8, 102}_0)
c  in CNF:
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_2
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_1
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_0
c  in DIMACS:
 10508  10509 -10510  808 -10511 0
 10508  10509 -10510  808 -10512 0
 10508  10509 -10510  808 -10513 0

c  0-1 --> -1
c    (-b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧ -p_808) -> ( b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0)
c  in CNF:
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨  b^{8, 102}_2
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_1
c     b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨  b^{8, 102}_0
c  in DIMACS:
 10508  10509  10510  808  10511 0
 10508  10509  10510  808 -10512 0
 10508  10509  10510  808  10513 0

c  -1-1 --> -2
c    ( b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧  b^{8, 101}_0 ∧ -p_808) -> ( b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0)
c  in CNF:
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨  b^{8, 102}_2
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨  b^{8, 102}_1
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨  p_808 ∨ -b^{8, 102}_0
c  in DIMACS:
-10508  10509 -10510  808  10511 0
-10508  10509 -10510  808  10512 0
-10508  10509 -10510  808 -10513 0

c  -2-1 --> break 
c    ( b^{8, 101}_2 ∧  b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨  b^{8, 101}_0 ∨  p_808 ∨ break
c  in DIMACS:
-10508 -10509  10510  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 101}_2 ∧ -b^{8, 101}_1 ∧ -b^{8, 101}_0 ∧ true) 
c  in CNF:
c    -b^{8, 101}_2 ∨  b^{8, 101}_1 ∨  b^{8, 101}_0 ∨ false 
c  in DIMACS:
-10508  10509  10510  0

c  3 does not represent an automaton state.
c    -(-b^{8, 101}_2 ∧  b^{8, 101}_1 ∧  b^{8, 101}_0 ∧ true) 
c  in CNF:
c     b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ false 
c  in DIMACS:
 10508 -10509 -10510  0
c  -3 does not represent an automaton state.
c    -( b^{8, 101}_2 ∧  b^{8, 101}_1 ∧  b^{8, 101}_0 ∧ true) 
c  in CNF:
c    -b^{8, 101}_2 ∨ -b^{8, 101}_1 ∨ -b^{8, 101}_0 ∨ false 
c  in DIMACS:
-10508 -10509 -10510  0

c i = 102
c  -2+1 --> -1
c    ( b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧  p_816) -> ( b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0)
c  in CNF:
c    -b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨  b^{8, 103}_2
c    -b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_1
c    -b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨  b^{8, 103}_0
c  in DIMACS:
-10511 -10512  10513 -816  10514 0
-10511 -10512  10513 -816 -10515 0
-10511 -10512  10513 -816  10516 0

c  -1+1 --> 0
c    ( b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0 ∧  p_816) -> (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧ -b^{8, 103}_0)
c  in CNF:
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_2
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_1
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_0
c  in DIMACS:
-10511  10512 -10513 -816 -10514 0
-10511  10512 -10513 -816 -10515 0
-10511  10512 -10513 -816 -10516 0

c  0+1 --> 1
c    (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧  p_816) -> (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0)
c  in CNF:
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_2
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_1
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨  b^{8, 103}_0
c  in DIMACS:
 10511  10512  10513 -816 -10514 0
 10511  10512  10513 -816 -10515 0
 10511  10512  10513 -816  10516 0

c  1+1 --> 2
c    (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0 ∧  p_816) -> (-b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0)
c  in CNF:
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_2
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨  b^{8, 103}_1
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ -p_816 ∨ -b^{8, 103}_0
c  in DIMACS:
 10511  10512 -10513 -816 -10514 0
 10511  10512 -10513 -816  10515 0
 10511  10512 -10513 -816 -10516 0

c  2+1 --> break 
c    (-b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧  p_816) -> break
c  in CNF:
c     b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 10511 -10512  10513 -816 1162 0


c  2-1 --> 1
c    (-b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧ -p_816) -> (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0)
c  in CNF:
c     b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_2
c     b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_1
c     b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨  b^{8, 103}_0
c  in DIMACS:
 10511 -10512  10513  816 -10514 0
 10511 -10512  10513  816 -10515 0
 10511 -10512  10513  816  10516 0

c  1-1 --> 0
c    (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0 ∧ -p_816) -> (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧ -b^{8, 103}_0)
c  in CNF:
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_2
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_1
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_0
c  in DIMACS:
 10511  10512 -10513  816 -10514 0
 10511  10512 -10513  816 -10515 0
 10511  10512 -10513  816 -10516 0

c  0-1 --> -1
c    (-b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧ -p_816) -> ( b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0)
c  in CNF:
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨  b^{8, 103}_2
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_1
c     b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨  b^{8, 103}_0
c  in DIMACS:
 10511  10512  10513  816  10514 0
 10511  10512  10513  816 -10515 0
 10511  10512  10513  816  10516 0

c  -1-1 --> -2
c    ( b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧  b^{8, 102}_0 ∧ -p_816) -> ( b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0)
c  in CNF:
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨  b^{8, 103}_2
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨  b^{8, 103}_1
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨  p_816 ∨ -b^{8, 103}_0
c  in DIMACS:
-10511  10512 -10513  816  10514 0
-10511  10512 -10513  816  10515 0
-10511  10512 -10513  816 -10516 0

c  -2-1 --> break 
c    ( b^{8, 102}_2 ∧  b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨  b^{8, 102}_0 ∨  p_816 ∨ break
c  in DIMACS:
-10511 -10512  10513  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 102}_2 ∧ -b^{8, 102}_1 ∧ -b^{8, 102}_0 ∧ true) 
c  in CNF:
c    -b^{8, 102}_2 ∨  b^{8, 102}_1 ∨  b^{8, 102}_0 ∨ false 
c  in DIMACS:
-10511  10512  10513  0

c  3 does not represent an automaton state.
c    -(-b^{8, 102}_2 ∧  b^{8, 102}_1 ∧  b^{8, 102}_0 ∧ true) 
c  in CNF:
c     b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ false 
c  in DIMACS:
 10511 -10512 -10513  0
c  -3 does not represent an automaton state.
c    -( b^{8, 102}_2 ∧  b^{8, 102}_1 ∧  b^{8, 102}_0 ∧ true) 
c  in CNF:
c    -b^{8, 102}_2 ∨ -b^{8, 102}_1 ∨ -b^{8, 102}_0 ∨ false 
c  in DIMACS:
-10511 -10512 -10513  0

c i = 103
c  -2+1 --> -1
c    ( b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧  p_824) -> ( b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0)
c  in CNF:
c    -b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨  b^{8, 104}_2
c    -b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_1
c    -b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨  b^{8, 104}_0
c  in DIMACS:
-10514 -10515  10516 -824  10517 0
-10514 -10515  10516 -824 -10518 0
-10514 -10515  10516 -824  10519 0

c  -1+1 --> 0
c    ( b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0 ∧  p_824) -> (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧ -b^{8, 104}_0)
c  in CNF:
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_2
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_1
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_0
c  in DIMACS:
-10514  10515 -10516 -824 -10517 0
-10514  10515 -10516 -824 -10518 0
-10514  10515 -10516 -824 -10519 0

c  0+1 --> 1
c    (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧  p_824) -> (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0)
c  in CNF:
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_2
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_1
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨  b^{8, 104}_0
c  in DIMACS:
 10514  10515  10516 -824 -10517 0
 10514  10515  10516 -824 -10518 0
 10514  10515  10516 -824  10519 0

c  1+1 --> 2
c    (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0 ∧  p_824) -> (-b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0)
c  in CNF:
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_2
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨  b^{8, 104}_1
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ -p_824 ∨ -b^{8, 104}_0
c  in DIMACS:
 10514  10515 -10516 -824 -10517 0
 10514  10515 -10516 -824  10518 0
 10514  10515 -10516 -824 -10519 0

c  2+1 --> break 
c    (-b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧  p_824) -> break
c  in CNF:
c     b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 10514 -10515  10516 -824 1162 0


c  2-1 --> 1
c    (-b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧ -p_824) -> (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0)
c  in CNF:
c     b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_2
c     b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_1
c     b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨  b^{8, 104}_0
c  in DIMACS:
 10514 -10515  10516  824 -10517 0
 10514 -10515  10516  824 -10518 0
 10514 -10515  10516  824  10519 0

c  1-1 --> 0
c    (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0 ∧ -p_824) -> (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧ -b^{8, 104}_0)
c  in CNF:
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_2
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_1
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_0
c  in DIMACS:
 10514  10515 -10516  824 -10517 0
 10514  10515 -10516  824 -10518 0
 10514  10515 -10516  824 -10519 0

c  0-1 --> -1
c    (-b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧ -p_824) -> ( b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0)
c  in CNF:
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨  b^{8, 104}_2
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_1
c     b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨  b^{8, 104}_0
c  in DIMACS:
 10514  10515  10516  824  10517 0
 10514  10515  10516  824 -10518 0
 10514  10515  10516  824  10519 0

c  -1-1 --> -2
c    ( b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧  b^{8, 103}_0 ∧ -p_824) -> ( b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0)
c  in CNF:
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨  b^{8, 104}_2
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨  b^{8, 104}_1
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨  p_824 ∨ -b^{8, 104}_0
c  in DIMACS:
-10514  10515 -10516  824  10517 0
-10514  10515 -10516  824  10518 0
-10514  10515 -10516  824 -10519 0

c  -2-1 --> break 
c    ( b^{8, 103}_2 ∧  b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨  b^{8, 103}_0 ∨  p_824 ∨ break
c  in DIMACS:
-10514 -10515  10516  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 103}_2 ∧ -b^{8, 103}_1 ∧ -b^{8, 103}_0 ∧ true) 
c  in CNF:
c    -b^{8, 103}_2 ∨  b^{8, 103}_1 ∨  b^{8, 103}_0 ∨ false 
c  in DIMACS:
-10514  10515  10516  0

c  3 does not represent an automaton state.
c    -(-b^{8, 103}_2 ∧  b^{8, 103}_1 ∧  b^{8, 103}_0 ∧ true) 
c  in CNF:
c     b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ false 
c  in DIMACS:
 10514 -10515 -10516  0
c  -3 does not represent an automaton state.
c    -( b^{8, 103}_2 ∧  b^{8, 103}_1 ∧  b^{8, 103}_0 ∧ true) 
c  in CNF:
c    -b^{8, 103}_2 ∨ -b^{8, 103}_1 ∨ -b^{8, 103}_0 ∨ false 
c  in DIMACS:
-10514 -10515 -10516  0

c i = 104
c  -2+1 --> -1
c    ( b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧  p_832) -> ( b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0)
c  in CNF:
c    -b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨  b^{8, 105}_2
c    -b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_1
c    -b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨  b^{8, 105}_0
c  in DIMACS:
-10517 -10518  10519 -832  10520 0
-10517 -10518  10519 -832 -10521 0
-10517 -10518  10519 -832  10522 0

c  -1+1 --> 0
c    ( b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0 ∧  p_832) -> (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧ -b^{8, 105}_0)
c  in CNF:
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_2
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_1
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_0
c  in DIMACS:
-10517  10518 -10519 -832 -10520 0
-10517  10518 -10519 -832 -10521 0
-10517  10518 -10519 -832 -10522 0

c  0+1 --> 1
c    (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧  p_832) -> (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0)
c  in CNF:
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_2
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_1
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨  b^{8, 105}_0
c  in DIMACS:
 10517  10518  10519 -832 -10520 0
 10517  10518  10519 -832 -10521 0
 10517  10518  10519 -832  10522 0

c  1+1 --> 2
c    (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0 ∧  p_832) -> (-b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0)
c  in CNF:
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_2
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨  b^{8, 105}_1
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ -p_832 ∨ -b^{8, 105}_0
c  in DIMACS:
 10517  10518 -10519 -832 -10520 0
 10517  10518 -10519 -832  10521 0
 10517  10518 -10519 -832 -10522 0

c  2+1 --> break 
c    (-b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧  p_832) -> break
c  in CNF:
c     b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 10517 -10518  10519 -832 1162 0


c  2-1 --> 1
c    (-b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧ -p_832) -> (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0)
c  in CNF:
c     b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_2
c     b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_1
c     b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨  b^{8, 105}_0
c  in DIMACS:
 10517 -10518  10519  832 -10520 0
 10517 -10518  10519  832 -10521 0
 10517 -10518  10519  832  10522 0

c  1-1 --> 0
c    (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0 ∧ -p_832) -> (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧ -b^{8, 105}_0)
c  in CNF:
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_2
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_1
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_0
c  in DIMACS:
 10517  10518 -10519  832 -10520 0
 10517  10518 -10519  832 -10521 0
 10517  10518 -10519  832 -10522 0

c  0-1 --> -1
c    (-b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧ -p_832) -> ( b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0)
c  in CNF:
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨  b^{8, 105}_2
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_1
c     b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨  b^{8, 105}_0
c  in DIMACS:
 10517  10518  10519  832  10520 0
 10517  10518  10519  832 -10521 0
 10517  10518  10519  832  10522 0

c  -1-1 --> -2
c    ( b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧  b^{8, 104}_0 ∧ -p_832) -> ( b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0)
c  in CNF:
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨  b^{8, 105}_2
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨  b^{8, 105}_1
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨  p_832 ∨ -b^{8, 105}_0
c  in DIMACS:
-10517  10518 -10519  832  10520 0
-10517  10518 -10519  832  10521 0
-10517  10518 -10519  832 -10522 0

c  -2-1 --> break 
c    ( b^{8, 104}_2 ∧  b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨  b^{8, 104}_0 ∨  p_832 ∨ break
c  in DIMACS:
-10517 -10518  10519  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 104}_2 ∧ -b^{8, 104}_1 ∧ -b^{8, 104}_0 ∧ true) 
c  in CNF:
c    -b^{8, 104}_2 ∨  b^{8, 104}_1 ∨  b^{8, 104}_0 ∨ false 
c  in DIMACS:
-10517  10518  10519  0

c  3 does not represent an automaton state.
c    -(-b^{8, 104}_2 ∧  b^{8, 104}_1 ∧  b^{8, 104}_0 ∧ true) 
c  in CNF:
c     b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ false 
c  in DIMACS:
 10517 -10518 -10519  0
c  -3 does not represent an automaton state.
c    -( b^{8, 104}_2 ∧  b^{8, 104}_1 ∧  b^{8, 104}_0 ∧ true) 
c  in CNF:
c    -b^{8, 104}_2 ∨ -b^{8, 104}_1 ∨ -b^{8, 104}_0 ∨ false 
c  in DIMACS:
-10517 -10518 -10519  0

c i = 105
c  -2+1 --> -1
c    ( b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧  p_840) -> ( b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0)
c  in CNF:
c    -b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨  b^{8, 106}_2
c    -b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_1
c    -b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨  b^{8, 106}_0
c  in DIMACS:
-10520 -10521  10522 -840  10523 0
-10520 -10521  10522 -840 -10524 0
-10520 -10521  10522 -840  10525 0

c  -1+1 --> 0
c    ( b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0 ∧  p_840) -> (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧ -b^{8, 106}_0)
c  in CNF:
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_2
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_1
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_0
c  in DIMACS:
-10520  10521 -10522 -840 -10523 0
-10520  10521 -10522 -840 -10524 0
-10520  10521 -10522 -840 -10525 0

c  0+1 --> 1
c    (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧  p_840) -> (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0)
c  in CNF:
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_2
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_1
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨  b^{8, 106}_0
c  in DIMACS:
 10520  10521  10522 -840 -10523 0
 10520  10521  10522 -840 -10524 0
 10520  10521  10522 -840  10525 0

c  1+1 --> 2
c    (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0 ∧  p_840) -> (-b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0)
c  in CNF:
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_2
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨  b^{8, 106}_1
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ -p_840 ∨ -b^{8, 106}_0
c  in DIMACS:
 10520  10521 -10522 -840 -10523 0
 10520  10521 -10522 -840  10524 0
 10520  10521 -10522 -840 -10525 0

c  2+1 --> break 
c    (-b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧  p_840) -> break
c  in CNF:
c     b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 10520 -10521  10522 -840 1162 0


c  2-1 --> 1
c    (-b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧ -p_840) -> (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0)
c  in CNF:
c     b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_2
c     b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_1
c     b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨  b^{8, 106}_0
c  in DIMACS:
 10520 -10521  10522  840 -10523 0
 10520 -10521  10522  840 -10524 0
 10520 -10521  10522  840  10525 0

c  1-1 --> 0
c    (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0 ∧ -p_840) -> (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧ -b^{8, 106}_0)
c  in CNF:
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_2
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_1
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_0
c  in DIMACS:
 10520  10521 -10522  840 -10523 0
 10520  10521 -10522  840 -10524 0
 10520  10521 -10522  840 -10525 0

c  0-1 --> -1
c    (-b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧ -p_840) -> ( b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0)
c  in CNF:
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨  b^{8, 106}_2
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_1
c     b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨  b^{8, 106}_0
c  in DIMACS:
 10520  10521  10522  840  10523 0
 10520  10521  10522  840 -10524 0
 10520  10521  10522  840  10525 0

c  -1-1 --> -2
c    ( b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧  b^{8, 105}_0 ∧ -p_840) -> ( b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0)
c  in CNF:
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨  b^{8, 106}_2
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨  b^{8, 106}_1
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨  p_840 ∨ -b^{8, 106}_0
c  in DIMACS:
-10520  10521 -10522  840  10523 0
-10520  10521 -10522  840  10524 0
-10520  10521 -10522  840 -10525 0

c  -2-1 --> break 
c    ( b^{8, 105}_2 ∧  b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨  b^{8, 105}_0 ∨  p_840 ∨ break
c  in DIMACS:
-10520 -10521  10522  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 105}_2 ∧ -b^{8, 105}_1 ∧ -b^{8, 105}_0 ∧ true) 
c  in CNF:
c    -b^{8, 105}_2 ∨  b^{8, 105}_1 ∨  b^{8, 105}_0 ∨ false 
c  in DIMACS:
-10520  10521  10522  0

c  3 does not represent an automaton state.
c    -(-b^{8, 105}_2 ∧  b^{8, 105}_1 ∧  b^{8, 105}_0 ∧ true) 
c  in CNF:
c     b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ false 
c  in DIMACS:
 10520 -10521 -10522  0
c  -3 does not represent an automaton state.
c    -( b^{8, 105}_2 ∧  b^{8, 105}_1 ∧  b^{8, 105}_0 ∧ true) 
c  in CNF:
c    -b^{8, 105}_2 ∨ -b^{8, 105}_1 ∨ -b^{8, 105}_0 ∨ false 
c  in DIMACS:
-10520 -10521 -10522  0

c i = 106
c  -2+1 --> -1
c    ( b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧  p_848) -> ( b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0)
c  in CNF:
c    -b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨  b^{8, 107}_2
c    -b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_1
c    -b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨  b^{8, 107}_0
c  in DIMACS:
-10523 -10524  10525 -848  10526 0
-10523 -10524  10525 -848 -10527 0
-10523 -10524  10525 -848  10528 0

c  -1+1 --> 0
c    ( b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0 ∧  p_848) -> (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧ -b^{8, 107}_0)
c  in CNF:
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_2
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_1
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_0
c  in DIMACS:
-10523  10524 -10525 -848 -10526 0
-10523  10524 -10525 -848 -10527 0
-10523  10524 -10525 -848 -10528 0

c  0+1 --> 1
c    (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧  p_848) -> (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0)
c  in CNF:
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_2
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_1
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨  b^{8, 107}_0
c  in DIMACS:
 10523  10524  10525 -848 -10526 0
 10523  10524  10525 -848 -10527 0
 10523  10524  10525 -848  10528 0

c  1+1 --> 2
c    (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0 ∧  p_848) -> (-b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0)
c  in CNF:
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_2
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨  b^{8, 107}_1
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ -p_848 ∨ -b^{8, 107}_0
c  in DIMACS:
 10523  10524 -10525 -848 -10526 0
 10523  10524 -10525 -848  10527 0
 10523  10524 -10525 -848 -10528 0

c  2+1 --> break 
c    (-b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧  p_848) -> break
c  in CNF:
c     b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 10523 -10524  10525 -848 1162 0


c  2-1 --> 1
c    (-b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧ -p_848) -> (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0)
c  in CNF:
c     b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_2
c     b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_1
c     b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨  b^{8, 107}_0
c  in DIMACS:
 10523 -10524  10525  848 -10526 0
 10523 -10524  10525  848 -10527 0
 10523 -10524  10525  848  10528 0

c  1-1 --> 0
c    (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0 ∧ -p_848) -> (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧ -b^{8, 107}_0)
c  in CNF:
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_2
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_1
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_0
c  in DIMACS:
 10523  10524 -10525  848 -10526 0
 10523  10524 -10525  848 -10527 0
 10523  10524 -10525  848 -10528 0

c  0-1 --> -1
c    (-b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧ -p_848) -> ( b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0)
c  in CNF:
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨  b^{8, 107}_2
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_1
c     b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨  b^{8, 107}_0
c  in DIMACS:
 10523  10524  10525  848  10526 0
 10523  10524  10525  848 -10527 0
 10523  10524  10525  848  10528 0

c  -1-1 --> -2
c    ( b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧  b^{8, 106}_0 ∧ -p_848) -> ( b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0)
c  in CNF:
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨  b^{8, 107}_2
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨  b^{8, 107}_1
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨  p_848 ∨ -b^{8, 107}_0
c  in DIMACS:
-10523  10524 -10525  848  10526 0
-10523  10524 -10525  848  10527 0
-10523  10524 -10525  848 -10528 0

c  -2-1 --> break 
c    ( b^{8, 106}_2 ∧  b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨  b^{8, 106}_0 ∨  p_848 ∨ break
c  in DIMACS:
-10523 -10524  10525  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 106}_2 ∧ -b^{8, 106}_1 ∧ -b^{8, 106}_0 ∧ true) 
c  in CNF:
c    -b^{8, 106}_2 ∨  b^{8, 106}_1 ∨  b^{8, 106}_0 ∨ false 
c  in DIMACS:
-10523  10524  10525  0

c  3 does not represent an automaton state.
c    -(-b^{8, 106}_2 ∧  b^{8, 106}_1 ∧  b^{8, 106}_0 ∧ true) 
c  in CNF:
c     b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ false 
c  in DIMACS:
 10523 -10524 -10525  0
c  -3 does not represent an automaton state.
c    -( b^{8, 106}_2 ∧  b^{8, 106}_1 ∧  b^{8, 106}_0 ∧ true) 
c  in CNF:
c    -b^{8, 106}_2 ∨ -b^{8, 106}_1 ∨ -b^{8, 106}_0 ∨ false 
c  in DIMACS:
-10523 -10524 -10525  0

c i = 107
c  -2+1 --> -1
c    ( b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧  p_856) -> ( b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0)
c  in CNF:
c    -b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨  b^{8, 108}_2
c    -b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_1
c    -b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨  b^{8, 108}_0
c  in DIMACS:
-10526 -10527  10528 -856  10529 0
-10526 -10527  10528 -856 -10530 0
-10526 -10527  10528 -856  10531 0

c  -1+1 --> 0
c    ( b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0 ∧  p_856) -> (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧ -b^{8, 108}_0)
c  in CNF:
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_2
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_1
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_0
c  in DIMACS:
-10526  10527 -10528 -856 -10529 0
-10526  10527 -10528 -856 -10530 0
-10526  10527 -10528 -856 -10531 0

c  0+1 --> 1
c    (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧  p_856) -> (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0)
c  in CNF:
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_2
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_1
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨  b^{8, 108}_0
c  in DIMACS:
 10526  10527  10528 -856 -10529 0
 10526  10527  10528 -856 -10530 0
 10526  10527  10528 -856  10531 0

c  1+1 --> 2
c    (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0 ∧  p_856) -> (-b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0)
c  in CNF:
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_2
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨  b^{8, 108}_1
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ -p_856 ∨ -b^{8, 108}_0
c  in DIMACS:
 10526  10527 -10528 -856 -10529 0
 10526  10527 -10528 -856  10530 0
 10526  10527 -10528 -856 -10531 0

c  2+1 --> break 
c    (-b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧  p_856) -> break
c  in CNF:
c     b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 10526 -10527  10528 -856 1162 0


c  2-1 --> 1
c    (-b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧ -p_856) -> (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0)
c  in CNF:
c     b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_2
c     b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_1
c     b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨  b^{8, 108}_0
c  in DIMACS:
 10526 -10527  10528  856 -10529 0
 10526 -10527  10528  856 -10530 0
 10526 -10527  10528  856  10531 0

c  1-1 --> 0
c    (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0 ∧ -p_856) -> (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧ -b^{8, 108}_0)
c  in CNF:
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_2
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_1
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_0
c  in DIMACS:
 10526  10527 -10528  856 -10529 0
 10526  10527 -10528  856 -10530 0
 10526  10527 -10528  856 -10531 0

c  0-1 --> -1
c    (-b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧ -p_856) -> ( b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0)
c  in CNF:
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨  b^{8, 108}_2
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_1
c     b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨  b^{8, 108}_0
c  in DIMACS:
 10526  10527  10528  856  10529 0
 10526  10527  10528  856 -10530 0
 10526  10527  10528  856  10531 0

c  -1-1 --> -2
c    ( b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧  b^{8, 107}_0 ∧ -p_856) -> ( b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0)
c  in CNF:
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨  b^{8, 108}_2
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨  b^{8, 108}_1
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨  p_856 ∨ -b^{8, 108}_0
c  in DIMACS:
-10526  10527 -10528  856  10529 0
-10526  10527 -10528  856  10530 0
-10526  10527 -10528  856 -10531 0

c  -2-1 --> break 
c    ( b^{8, 107}_2 ∧  b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨  b^{8, 107}_0 ∨  p_856 ∨ break
c  in DIMACS:
-10526 -10527  10528  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 107}_2 ∧ -b^{8, 107}_1 ∧ -b^{8, 107}_0 ∧ true) 
c  in CNF:
c    -b^{8, 107}_2 ∨  b^{8, 107}_1 ∨  b^{8, 107}_0 ∨ false 
c  in DIMACS:
-10526  10527  10528  0

c  3 does not represent an automaton state.
c    -(-b^{8, 107}_2 ∧  b^{8, 107}_1 ∧  b^{8, 107}_0 ∧ true) 
c  in CNF:
c     b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ false 
c  in DIMACS:
 10526 -10527 -10528  0
c  -3 does not represent an automaton state.
c    -( b^{8, 107}_2 ∧  b^{8, 107}_1 ∧  b^{8, 107}_0 ∧ true) 
c  in CNF:
c    -b^{8, 107}_2 ∨ -b^{8, 107}_1 ∨ -b^{8, 107}_0 ∨ false 
c  in DIMACS:
-10526 -10527 -10528  0

c i = 108
c  -2+1 --> -1
c    ( b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧  p_864) -> ( b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0)
c  in CNF:
c    -b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨  b^{8, 109}_2
c    -b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_1
c    -b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨  b^{8, 109}_0
c  in DIMACS:
-10529 -10530  10531 -864  10532 0
-10529 -10530  10531 -864 -10533 0
-10529 -10530  10531 -864  10534 0

c  -1+1 --> 0
c    ( b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0 ∧  p_864) -> (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧ -b^{8, 109}_0)
c  in CNF:
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_2
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_1
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_0
c  in DIMACS:
-10529  10530 -10531 -864 -10532 0
-10529  10530 -10531 -864 -10533 0
-10529  10530 -10531 -864 -10534 0

c  0+1 --> 1
c    (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧  p_864) -> (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0)
c  in CNF:
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_2
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_1
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨  b^{8, 109}_0
c  in DIMACS:
 10529  10530  10531 -864 -10532 0
 10529  10530  10531 -864 -10533 0
 10529  10530  10531 -864  10534 0

c  1+1 --> 2
c    (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0 ∧  p_864) -> (-b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0)
c  in CNF:
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_2
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨  b^{8, 109}_1
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ -p_864 ∨ -b^{8, 109}_0
c  in DIMACS:
 10529  10530 -10531 -864 -10532 0
 10529  10530 -10531 -864  10533 0
 10529  10530 -10531 -864 -10534 0

c  2+1 --> break 
c    (-b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧  p_864) -> break
c  in CNF:
c     b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 10529 -10530  10531 -864 1162 0


c  2-1 --> 1
c    (-b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧ -p_864) -> (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0)
c  in CNF:
c     b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_2
c     b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_1
c     b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨  b^{8, 109}_0
c  in DIMACS:
 10529 -10530  10531  864 -10532 0
 10529 -10530  10531  864 -10533 0
 10529 -10530  10531  864  10534 0

c  1-1 --> 0
c    (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0 ∧ -p_864) -> (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧ -b^{8, 109}_0)
c  in CNF:
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_2
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_1
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_0
c  in DIMACS:
 10529  10530 -10531  864 -10532 0
 10529  10530 -10531  864 -10533 0
 10529  10530 -10531  864 -10534 0

c  0-1 --> -1
c    (-b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧ -p_864) -> ( b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0)
c  in CNF:
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨  b^{8, 109}_2
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_1
c     b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨  b^{8, 109}_0
c  in DIMACS:
 10529  10530  10531  864  10532 0
 10529  10530  10531  864 -10533 0
 10529  10530  10531  864  10534 0

c  -1-1 --> -2
c    ( b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧  b^{8, 108}_0 ∧ -p_864) -> ( b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0)
c  in CNF:
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨  b^{8, 109}_2
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨  b^{8, 109}_1
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨  p_864 ∨ -b^{8, 109}_0
c  in DIMACS:
-10529  10530 -10531  864  10532 0
-10529  10530 -10531  864  10533 0
-10529  10530 -10531  864 -10534 0

c  -2-1 --> break 
c    ( b^{8, 108}_2 ∧  b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨  b^{8, 108}_0 ∨  p_864 ∨ break
c  in DIMACS:
-10529 -10530  10531  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 108}_2 ∧ -b^{8, 108}_1 ∧ -b^{8, 108}_0 ∧ true) 
c  in CNF:
c    -b^{8, 108}_2 ∨  b^{8, 108}_1 ∨  b^{8, 108}_0 ∨ false 
c  in DIMACS:
-10529  10530  10531  0

c  3 does not represent an automaton state.
c    -(-b^{8, 108}_2 ∧  b^{8, 108}_1 ∧  b^{8, 108}_0 ∧ true) 
c  in CNF:
c     b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ false 
c  in DIMACS:
 10529 -10530 -10531  0
c  -3 does not represent an automaton state.
c    -( b^{8, 108}_2 ∧  b^{8, 108}_1 ∧  b^{8, 108}_0 ∧ true) 
c  in CNF:
c    -b^{8, 108}_2 ∨ -b^{8, 108}_1 ∨ -b^{8, 108}_0 ∨ false 
c  in DIMACS:
-10529 -10530 -10531  0

c i = 109
c  -2+1 --> -1
c    ( b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧  p_872) -> ( b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0)
c  in CNF:
c    -b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨  b^{8, 110}_2
c    -b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_1
c    -b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨  b^{8, 110}_0
c  in DIMACS:
-10532 -10533  10534 -872  10535 0
-10532 -10533  10534 -872 -10536 0
-10532 -10533  10534 -872  10537 0

c  -1+1 --> 0
c    ( b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0 ∧  p_872) -> (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧ -b^{8, 110}_0)
c  in CNF:
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_2
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_1
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_0
c  in DIMACS:
-10532  10533 -10534 -872 -10535 0
-10532  10533 -10534 -872 -10536 0
-10532  10533 -10534 -872 -10537 0

c  0+1 --> 1
c    (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧  p_872) -> (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0)
c  in CNF:
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_2
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_1
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨  b^{8, 110}_0
c  in DIMACS:
 10532  10533  10534 -872 -10535 0
 10532  10533  10534 -872 -10536 0
 10532  10533  10534 -872  10537 0

c  1+1 --> 2
c    (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0 ∧  p_872) -> (-b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0)
c  in CNF:
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_2
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨  b^{8, 110}_1
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ -p_872 ∨ -b^{8, 110}_0
c  in DIMACS:
 10532  10533 -10534 -872 -10535 0
 10532  10533 -10534 -872  10536 0
 10532  10533 -10534 -872 -10537 0

c  2+1 --> break 
c    (-b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧  p_872) -> break
c  in CNF:
c     b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 10532 -10533  10534 -872 1162 0


c  2-1 --> 1
c    (-b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧ -p_872) -> (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0)
c  in CNF:
c     b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_2
c     b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_1
c     b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨  b^{8, 110}_0
c  in DIMACS:
 10532 -10533  10534  872 -10535 0
 10532 -10533  10534  872 -10536 0
 10532 -10533  10534  872  10537 0

c  1-1 --> 0
c    (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0 ∧ -p_872) -> (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧ -b^{8, 110}_0)
c  in CNF:
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_2
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_1
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_0
c  in DIMACS:
 10532  10533 -10534  872 -10535 0
 10532  10533 -10534  872 -10536 0
 10532  10533 -10534  872 -10537 0

c  0-1 --> -1
c    (-b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧ -p_872) -> ( b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0)
c  in CNF:
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨  b^{8, 110}_2
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_1
c     b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨  b^{8, 110}_0
c  in DIMACS:
 10532  10533  10534  872  10535 0
 10532  10533  10534  872 -10536 0
 10532  10533  10534  872  10537 0

c  -1-1 --> -2
c    ( b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧  b^{8, 109}_0 ∧ -p_872) -> ( b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0)
c  in CNF:
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨  b^{8, 110}_2
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨  b^{8, 110}_1
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨  p_872 ∨ -b^{8, 110}_0
c  in DIMACS:
-10532  10533 -10534  872  10535 0
-10532  10533 -10534  872  10536 0
-10532  10533 -10534  872 -10537 0

c  -2-1 --> break 
c    ( b^{8, 109}_2 ∧  b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨  b^{8, 109}_0 ∨  p_872 ∨ break
c  in DIMACS:
-10532 -10533  10534  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 109}_2 ∧ -b^{8, 109}_1 ∧ -b^{8, 109}_0 ∧ true) 
c  in CNF:
c    -b^{8, 109}_2 ∨  b^{8, 109}_1 ∨  b^{8, 109}_0 ∨ false 
c  in DIMACS:
-10532  10533  10534  0

c  3 does not represent an automaton state.
c    -(-b^{8, 109}_2 ∧  b^{8, 109}_1 ∧  b^{8, 109}_0 ∧ true) 
c  in CNF:
c     b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ false 
c  in DIMACS:
 10532 -10533 -10534  0
c  -3 does not represent an automaton state.
c    -( b^{8, 109}_2 ∧  b^{8, 109}_1 ∧  b^{8, 109}_0 ∧ true) 
c  in CNF:
c    -b^{8, 109}_2 ∨ -b^{8, 109}_1 ∨ -b^{8, 109}_0 ∨ false 
c  in DIMACS:
-10532 -10533 -10534  0

c i = 110
c  -2+1 --> -1
c    ( b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧  p_880) -> ( b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0)
c  in CNF:
c    -b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨  b^{8, 111}_2
c    -b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_1
c    -b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨  b^{8, 111}_0
c  in DIMACS:
-10535 -10536  10537 -880  10538 0
-10535 -10536  10537 -880 -10539 0
-10535 -10536  10537 -880  10540 0

c  -1+1 --> 0
c    ( b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0 ∧  p_880) -> (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧ -b^{8, 111}_0)
c  in CNF:
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_2
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_1
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_0
c  in DIMACS:
-10535  10536 -10537 -880 -10538 0
-10535  10536 -10537 -880 -10539 0
-10535  10536 -10537 -880 -10540 0

c  0+1 --> 1
c    (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧  p_880) -> (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0)
c  in CNF:
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_2
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_1
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨  b^{8, 111}_0
c  in DIMACS:
 10535  10536  10537 -880 -10538 0
 10535  10536  10537 -880 -10539 0
 10535  10536  10537 -880  10540 0

c  1+1 --> 2
c    (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0 ∧  p_880) -> (-b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0)
c  in CNF:
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_2
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨  b^{8, 111}_1
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ -p_880 ∨ -b^{8, 111}_0
c  in DIMACS:
 10535  10536 -10537 -880 -10538 0
 10535  10536 -10537 -880  10539 0
 10535  10536 -10537 -880 -10540 0

c  2+1 --> break 
c    (-b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧  p_880) -> break
c  in CNF:
c     b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 10535 -10536  10537 -880 1162 0


c  2-1 --> 1
c    (-b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧ -p_880) -> (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0)
c  in CNF:
c     b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_2
c     b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_1
c     b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨  b^{8, 111}_0
c  in DIMACS:
 10535 -10536  10537  880 -10538 0
 10535 -10536  10537  880 -10539 0
 10535 -10536  10537  880  10540 0

c  1-1 --> 0
c    (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0 ∧ -p_880) -> (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧ -b^{8, 111}_0)
c  in CNF:
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_2
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_1
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_0
c  in DIMACS:
 10535  10536 -10537  880 -10538 0
 10535  10536 -10537  880 -10539 0
 10535  10536 -10537  880 -10540 0

c  0-1 --> -1
c    (-b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧ -p_880) -> ( b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0)
c  in CNF:
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨  b^{8, 111}_2
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_1
c     b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨  b^{8, 111}_0
c  in DIMACS:
 10535  10536  10537  880  10538 0
 10535  10536  10537  880 -10539 0
 10535  10536  10537  880  10540 0

c  -1-1 --> -2
c    ( b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧  b^{8, 110}_0 ∧ -p_880) -> ( b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0)
c  in CNF:
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨  b^{8, 111}_2
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨  b^{8, 111}_1
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨  p_880 ∨ -b^{8, 111}_0
c  in DIMACS:
-10535  10536 -10537  880  10538 0
-10535  10536 -10537  880  10539 0
-10535  10536 -10537  880 -10540 0

c  -2-1 --> break 
c    ( b^{8, 110}_2 ∧  b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨  b^{8, 110}_0 ∨  p_880 ∨ break
c  in DIMACS:
-10535 -10536  10537  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 110}_2 ∧ -b^{8, 110}_1 ∧ -b^{8, 110}_0 ∧ true) 
c  in CNF:
c    -b^{8, 110}_2 ∨  b^{8, 110}_1 ∨  b^{8, 110}_0 ∨ false 
c  in DIMACS:
-10535  10536  10537  0

c  3 does not represent an automaton state.
c    -(-b^{8, 110}_2 ∧  b^{8, 110}_1 ∧  b^{8, 110}_0 ∧ true) 
c  in CNF:
c     b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ false 
c  in DIMACS:
 10535 -10536 -10537  0
c  -3 does not represent an automaton state.
c    -( b^{8, 110}_2 ∧  b^{8, 110}_1 ∧  b^{8, 110}_0 ∧ true) 
c  in CNF:
c    -b^{8, 110}_2 ∨ -b^{8, 110}_1 ∨ -b^{8, 110}_0 ∨ false 
c  in DIMACS:
-10535 -10536 -10537  0

c i = 111
c  -2+1 --> -1
c    ( b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧  p_888) -> ( b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0)
c  in CNF:
c    -b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨  b^{8, 112}_2
c    -b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_1
c    -b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨  b^{8, 112}_0
c  in DIMACS:
-10538 -10539  10540 -888  10541 0
-10538 -10539  10540 -888 -10542 0
-10538 -10539  10540 -888  10543 0

c  -1+1 --> 0
c    ( b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0 ∧  p_888) -> (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧ -b^{8, 112}_0)
c  in CNF:
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_2
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_1
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_0
c  in DIMACS:
-10538  10539 -10540 -888 -10541 0
-10538  10539 -10540 -888 -10542 0
-10538  10539 -10540 -888 -10543 0

c  0+1 --> 1
c    (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧  p_888) -> (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0)
c  in CNF:
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_2
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_1
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨  b^{8, 112}_0
c  in DIMACS:
 10538  10539  10540 -888 -10541 0
 10538  10539  10540 -888 -10542 0
 10538  10539  10540 -888  10543 0

c  1+1 --> 2
c    (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0 ∧  p_888) -> (-b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0)
c  in CNF:
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_2
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨  b^{8, 112}_1
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ -p_888 ∨ -b^{8, 112}_0
c  in DIMACS:
 10538  10539 -10540 -888 -10541 0
 10538  10539 -10540 -888  10542 0
 10538  10539 -10540 -888 -10543 0

c  2+1 --> break 
c    (-b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧  p_888) -> break
c  in CNF:
c     b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 10538 -10539  10540 -888 1162 0


c  2-1 --> 1
c    (-b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧ -p_888) -> (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0)
c  in CNF:
c     b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_2
c     b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_1
c     b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨  b^{8, 112}_0
c  in DIMACS:
 10538 -10539  10540  888 -10541 0
 10538 -10539  10540  888 -10542 0
 10538 -10539  10540  888  10543 0

c  1-1 --> 0
c    (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0 ∧ -p_888) -> (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧ -b^{8, 112}_0)
c  in CNF:
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_2
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_1
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_0
c  in DIMACS:
 10538  10539 -10540  888 -10541 0
 10538  10539 -10540  888 -10542 0
 10538  10539 -10540  888 -10543 0

c  0-1 --> -1
c    (-b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧ -p_888) -> ( b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0)
c  in CNF:
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨  b^{8, 112}_2
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_1
c     b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨  b^{8, 112}_0
c  in DIMACS:
 10538  10539  10540  888  10541 0
 10538  10539  10540  888 -10542 0
 10538  10539  10540  888  10543 0

c  -1-1 --> -2
c    ( b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧  b^{8, 111}_0 ∧ -p_888) -> ( b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0)
c  in CNF:
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨  b^{8, 112}_2
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨  b^{8, 112}_1
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨  p_888 ∨ -b^{8, 112}_0
c  in DIMACS:
-10538  10539 -10540  888  10541 0
-10538  10539 -10540  888  10542 0
-10538  10539 -10540  888 -10543 0

c  -2-1 --> break 
c    ( b^{8, 111}_2 ∧  b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨  b^{8, 111}_0 ∨  p_888 ∨ break
c  in DIMACS:
-10538 -10539  10540  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 111}_2 ∧ -b^{8, 111}_1 ∧ -b^{8, 111}_0 ∧ true) 
c  in CNF:
c    -b^{8, 111}_2 ∨  b^{8, 111}_1 ∨  b^{8, 111}_0 ∨ false 
c  in DIMACS:
-10538  10539  10540  0

c  3 does not represent an automaton state.
c    -(-b^{8, 111}_2 ∧  b^{8, 111}_1 ∧  b^{8, 111}_0 ∧ true) 
c  in CNF:
c     b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ false 
c  in DIMACS:
 10538 -10539 -10540  0
c  -3 does not represent an automaton state.
c    -( b^{8, 111}_2 ∧  b^{8, 111}_1 ∧  b^{8, 111}_0 ∧ true) 
c  in CNF:
c    -b^{8, 111}_2 ∨ -b^{8, 111}_1 ∨ -b^{8, 111}_0 ∨ false 
c  in DIMACS:
-10538 -10539 -10540  0

c i = 112
c  -2+1 --> -1
c    ( b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧  p_896) -> ( b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0)
c  in CNF:
c    -b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨  b^{8, 113}_2
c    -b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_1
c    -b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨  b^{8, 113}_0
c  in DIMACS:
-10541 -10542  10543 -896  10544 0
-10541 -10542  10543 -896 -10545 0
-10541 -10542  10543 -896  10546 0

c  -1+1 --> 0
c    ( b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0 ∧  p_896) -> (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧ -b^{8, 113}_0)
c  in CNF:
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_2
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_1
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_0
c  in DIMACS:
-10541  10542 -10543 -896 -10544 0
-10541  10542 -10543 -896 -10545 0
-10541  10542 -10543 -896 -10546 0

c  0+1 --> 1
c    (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧  p_896) -> (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0)
c  in CNF:
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_2
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_1
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨  b^{8, 113}_0
c  in DIMACS:
 10541  10542  10543 -896 -10544 0
 10541  10542  10543 -896 -10545 0
 10541  10542  10543 -896  10546 0

c  1+1 --> 2
c    (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0 ∧  p_896) -> (-b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0)
c  in CNF:
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_2
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨  b^{8, 113}_1
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ -p_896 ∨ -b^{8, 113}_0
c  in DIMACS:
 10541  10542 -10543 -896 -10544 0
 10541  10542 -10543 -896  10545 0
 10541  10542 -10543 -896 -10546 0

c  2+1 --> break 
c    (-b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧  p_896) -> break
c  in CNF:
c     b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 10541 -10542  10543 -896 1162 0


c  2-1 --> 1
c    (-b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧ -p_896) -> (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0)
c  in CNF:
c     b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_2
c     b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_1
c     b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨  b^{8, 113}_0
c  in DIMACS:
 10541 -10542  10543  896 -10544 0
 10541 -10542  10543  896 -10545 0
 10541 -10542  10543  896  10546 0

c  1-1 --> 0
c    (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0 ∧ -p_896) -> (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧ -b^{8, 113}_0)
c  in CNF:
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_2
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_1
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_0
c  in DIMACS:
 10541  10542 -10543  896 -10544 0
 10541  10542 -10543  896 -10545 0
 10541  10542 -10543  896 -10546 0

c  0-1 --> -1
c    (-b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧ -p_896) -> ( b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0)
c  in CNF:
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨  b^{8, 113}_2
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_1
c     b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨  b^{8, 113}_0
c  in DIMACS:
 10541  10542  10543  896  10544 0
 10541  10542  10543  896 -10545 0
 10541  10542  10543  896  10546 0

c  -1-1 --> -2
c    ( b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧  b^{8, 112}_0 ∧ -p_896) -> ( b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0)
c  in CNF:
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨  b^{8, 113}_2
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨  b^{8, 113}_1
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨  p_896 ∨ -b^{8, 113}_0
c  in DIMACS:
-10541  10542 -10543  896  10544 0
-10541  10542 -10543  896  10545 0
-10541  10542 -10543  896 -10546 0

c  -2-1 --> break 
c    ( b^{8, 112}_2 ∧  b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨  b^{8, 112}_0 ∨  p_896 ∨ break
c  in DIMACS:
-10541 -10542  10543  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 112}_2 ∧ -b^{8, 112}_1 ∧ -b^{8, 112}_0 ∧ true) 
c  in CNF:
c    -b^{8, 112}_2 ∨  b^{8, 112}_1 ∨  b^{8, 112}_0 ∨ false 
c  in DIMACS:
-10541  10542  10543  0

c  3 does not represent an automaton state.
c    -(-b^{8, 112}_2 ∧  b^{8, 112}_1 ∧  b^{8, 112}_0 ∧ true) 
c  in CNF:
c     b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ false 
c  in DIMACS:
 10541 -10542 -10543  0
c  -3 does not represent an automaton state.
c    -( b^{8, 112}_2 ∧  b^{8, 112}_1 ∧  b^{8, 112}_0 ∧ true) 
c  in CNF:
c    -b^{8, 112}_2 ∨ -b^{8, 112}_1 ∨ -b^{8, 112}_0 ∨ false 
c  in DIMACS:
-10541 -10542 -10543  0

c i = 113
c  -2+1 --> -1
c    ( b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧  p_904) -> ( b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0)
c  in CNF:
c    -b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨  b^{8, 114}_2
c    -b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_1
c    -b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨  b^{8, 114}_0
c  in DIMACS:
-10544 -10545  10546 -904  10547 0
-10544 -10545  10546 -904 -10548 0
-10544 -10545  10546 -904  10549 0

c  -1+1 --> 0
c    ( b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0 ∧  p_904) -> (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧ -b^{8, 114}_0)
c  in CNF:
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_2
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_1
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_0
c  in DIMACS:
-10544  10545 -10546 -904 -10547 0
-10544  10545 -10546 -904 -10548 0
-10544  10545 -10546 -904 -10549 0

c  0+1 --> 1
c    (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧  p_904) -> (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0)
c  in CNF:
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_2
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_1
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨  b^{8, 114}_0
c  in DIMACS:
 10544  10545  10546 -904 -10547 0
 10544  10545  10546 -904 -10548 0
 10544  10545  10546 -904  10549 0

c  1+1 --> 2
c    (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0 ∧  p_904) -> (-b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0)
c  in CNF:
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_2
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨  b^{8, 114}_1
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ -p_904 ∨ -b^{8, 114}_0
c  in DIMACS:
 10544  10545 -10546 -904 -10547 0
 10544  10545 -10546 -904  10548 0
 10544  10545 -10546 -904 -10549 0

c  2+1 --> break 
c    (-b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧  p_904) -> break
c  in CNF:
c     b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 10544 -10545  10546 -904 1162 0


c  2-1 --> 1
c    (-b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧ -p_904) -> (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0)
c  in CNF:
c     b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_2
c     b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_1
c     b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨  b^{8, 114}_0
c  in DIMACS:
 10544 -10545  10546  904 -10547 0
 10544 -10545  10546  904 -10548 0
 10544 -10545  10546  904  10549 0

c  1-1 --> 0
c    (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0 ∧ -p_904) -> (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧ -b^{8, 114}_0)
c  in CNF:
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_2
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_1
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_0
c  in DIMACS:
 10544  10545 -10546  904 -10547 0
 10544  10545 -10546  904 -10548 0
 10544  10545 -10546  904 -10549 0

c  0-1 --> -1
c    (-b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧ -p_904) -> ( b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0)
c  in CNF:
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨  b^{8, 114}_2
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_1
c     b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨  b^{8, 114}_0
c  in DIMACS:
 10544  10545  10546  904  10547 0
 10544  10545  10546  904 -10548 0
 10544  10545  10546  904  10549 0

c  -1-1 --> -2
c    ( b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧  b^{8, 113}_0 ∧ -p_904) -> ( b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0)
c  in CNF:
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨  b^{8, 114}_2
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨  b^{8, 114}_1
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨  p_904 ∨ -b^{8, 114}_0
c  in DIMACS:
-10544  10545 -10546  904  10547 0
-10544  10545 -10546  904  10548 0
-10544  10545 -10546  904 -10549 0

c  -2-1 --> break 
c    ( b^{8, 113}_2 ∧  b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨  b^{8, 113}_0 ∨  p_904 ∨ break
c  in DIMACS:
-10544 -10545  10546  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 113}_2 ∧ -b^{8, 113}_1 ∧ -b^{8, 113}_0 ∧ true) 
c  in CNF:
c    -b^{8, 113}_2 ∨  b^{8, 113}_1 ∨  b^{8, 113}_0 ∨ false 
c  in DIMACS:
-10544  10545  10546  0

c  3 does not represent an automaton state.
c    -(-b^{8, 113}_2 ∧  b^{8, 113}_1 ∧  b^{8, 113}_0 ∧ true) 
c  in CNF:
c     b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ false 
c  in DIMACS:
 10544 -10545 -10546  0
c  -3 does not represent an automaton state.
c    -( b^{8, 113}_2 ∧  b^{8, 113}_1 ∧  b^{8, 113}_0 ∧ true) 
c  in CNF:
c    -b^{8, 113}_2 ∨ -b^{8, 113}_1 ∨ -b^{8, 113}_0 ∨ false 
c  in DIMACS:
-10544 -10545 -10546  0

c i = 114
c  -2+1 --> -1
c    ( b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧  p_912) -> ( b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0)
c  in CNF:
c    -b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨  b^{8, 115}_2
c    -b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_1
c    -b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨  b^{8, 115}_0
c  in DIMACS:
-10547 -10548  10549 -912  10550 0
-10547 -10548  10549 -912 -10551 0
-10547 -10548  10549 -912  10552 0

c  -1+1 --> 0
c    ( b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0 ∧  p_912) -> (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧ -b^{8, 115}_0)
c  in CNF:
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_2
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_1
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_0
c  in DIMACS:
-10547  10548 -10549 -912 -10550 0
-10547  10548 -10549 -912 -10551 0
-10547  10548 -10549 -912 -10552 0

c  0+1 --> 1
c    (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧  p_912) -> (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0)
c  in CNF:
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_2
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_1
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨  b^{8, 115}_0
c  in DIMACS:
 10547  10548  10549 -912 -10550 0
 10547  10548  10549 -912 -10551 0
 10547  10548  10549 -912  10552 0

c  1+1 --> 2
c    (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0 ∧  p_912) -> (-b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0)
c  in CNF:
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_2
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨  b^{8, 115}_1
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ -p_912 ∨ -b^{8, 115}_0
c  in DIMACS:
 10547  10548 -10549 -912 -10550 0
 10547  10548 -10549 -912  10551 0
 10547  10548 -10549 -912 -10552 0

c  2+1 --> break 
c    (-b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧  p_912) -> break
c  in CNF:
c     b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 10547 -10548  10549 -912 1162 0


c  2-1 --> 1
c    (-b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧ -p_912) -> (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0)
c  in CNF:
c     b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_2
c     b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_1
c     b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨  b^{8, 115}_0
c  in DIMACS:
 10547 -10548  10549  912 -10550 0
 10547 -10548  10549  912 -10551 0
 10547 -10548  10549  912  10552 0

c  1-1 --> 0
c    (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0 ∧ -p_912) -> (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧ -b^{8, 115}_0)
c  in CNF:
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_2
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_1
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_0
c  in DIMACS:
 10547  10548 -10549  912 -10550 0
 10547  10548 -10549  912 -10551 0
 10547  10548 -10549  912 -10552 0

c  0-1 --> -1
c    (-b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧ -p_912) -> ( b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0)
c  in CNF:
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨  b^{8, 115}_2
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_1
c     b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨  b^{8, 115}_0
c  in DIMACS:
 10547  10548  10549  912  10550 0
 10547  10548  10549  912 -10551 0
 10547  10548  10549  912  10552 0

c  -1-1 --> -2
c    ( b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧  b^{8, 114}_0 ∧ -p_912) -> ( b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0)
c  in CNF:
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨  b^{8, 115}_2
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨  b^{8, 115}_1
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨  p_912 ∨ -b^{8, 115}_0
c  in DIMACS:
-10547  10548 -10549  912  10550 0
-10547  10548 -10549  912  10551 0
-10547  10548 -10549  912 -10552 0

c  -2-1 --> break 
c    ( b^{8, 114}_2 ∧  b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨  b^{8, 114}_0 ∨  p_912 ∨ break
c  in DIMACS:
-10547 -10548  10549  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 114}_2 ∧ -b^{8, 114}_1 ∧ -b^{8, 114}_0 ∧ true) 
c  in CNF:
c    -b^{8, 114}_2 ∨  b^{8, 114}_1 ∨  b^{8, 114}_0 ∨ false 
c  in DIMACS:
-10547  10548  10549  0

c  3 does not represent an automaton state.
c    -(-b^{8, 114}_2 ∧  b^{8, 114}_1 ∧  b^{8, 114}_0 ∧ true) 
c  in CNF:
c     b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ false 
c  in DIMACS:
 10547 -10548 -10549  0
c  -3 does not represent an automaton state.
c    -( b^{8, 114}_2 ∧  b^{8, 114}_1 ∧  b^{8, 114}_0 ∧ true) 
c  in CNF:
c    -b^{8, 114}_2 ∨ -b^{8, 114}_1 ∨ -b^{8, 114}_0 ∨ false 
c  in DIMACS:
-10547 -10548 -10549  0

c i = 115
c  -2+1 --> -1
c    ( b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧  p_920) -> ( b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0)
c  in CNF:
c    -b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨  b^{8, 116}_2
c    -b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_1
c    -b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨  b^{8, 116}_0
c  in DIMACS:
-10550 -10551  10552 -920  10553 0
-10550 -10551  10552 -920 -10554 0
-10550 -10551  10552 -920  10555 0

c  -1+1 --> 0
c    ( b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0 ∧  p_920) -> (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧ -b^{8, 116}_0)
c  in CNF:
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_2
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_1
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_0
c  in DIMACS:
-10550  10551 -10552 -920 -10553 0
-10550  10551 -10552 -920 -10554 0
-10550  10551 -10552 -920 -10555 0

c  0+1 --> 1
c    (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧  p_920) -> (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0)
c  in CNF:
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_2
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_1
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨  b^{8, 116}_0
c  in DIMACS:
 10550  10551  10552 -920 -10553 0
 10550  10551  10552 -920 -10554 0
 10550  10551  10552 -920  10555 0

c  1+1 --> 2
c    (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0 ∧  p_920) -> (-b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0)
c  in CNF:
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_2
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨  b^{8, 116}_1
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ -p_920 ∨ -b^{8, 116}_0
c  in DIMACS:
 10550  10551 -10552 -920 -10553 0
 10550  10551 -10552 -920  10554 0
 10550  10551 -10552 -920 -10555 0

c  2+1 --> break 
c    (-b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧  p_920) -> break
c  in CNF:
c     b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 10550 -10551  10552 -920 1162 0


c  2-1 --> 1
c    (-b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧ -p_920) -> (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0)
c  in CNF:
c     b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_2
c     b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_1
c     b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨  b^{8, 116}_0
c  in DIMACS:
 10550 -10551  10552  920 -10553 0
 10550 -10551  10552  920 -10554 0
 10550 -10551  10552  920  10555 0

c  1-1 --> 0
c    (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0 ∧ -p_920) -> (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧ -b^{8, 116}_0)
c  in CNF:
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_2
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_1
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_0
c  in DIMACS:
 10550  10551 -10552  920 -10553 0
 10550  10551 -10552  920 -10554 0
 10550  10551 -10552  920 -10555 0

c  0-1 --> -1
c    (-b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧ -p_920) -> ( b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0)
c  in CNF:
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨  b^{8, 116}_2
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_1
c     b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨  b^{8, 116}_0
c  in DIMACS:
 10550  10551  10552  920  10553 0
 10550  10551  10552  920 -10554 0
 10550  10551  10552  920  10555 0

c  -1-1 --> -2
c    ( b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧  b^{8, 115}_0 ∧ -p_920) -> ( b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0)
c  in CNF:
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨  b^{8, 116}_2
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨  b^{8, 116}_1
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨  p_920 ∨ -b^{8, 116}_0
c  in DIMACS:
-10550  10551 -10552  920  10553 0
-10550  10551 -10552  920  10554 0
-10550  10551 -10552  920 -10555 0

c  -2-1 --> break 
c    ( b^{8, 115}_2 ∧  b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨  b^{8, 115}_0 ∨  p_920 ∨ break
c  in DIMACS:
-10550 -10551  10552  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 115}_2 ∧ -b^{8, 115}_1 ∧ -b^{8, 115}_0 ∧ true) 
c  in CNF:
c    -b^{8, 115}_2 ∨  b^{8, 115}_1 ∨  b^{8, 115}_0 ∨ false 
c  in DIMACS:
-10550  10551  10552  0

c  3 does not represent an automaton state.
c    -(-b^{8, 115}_2 ∧  b^{8, 115}_1 ∧  b^{8, 115}_0 ∧ true) 
c  in CNF:
c     b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ false 
c  in DIMACS:
 10550 -10551 -10552  0
c  -3 does not represent an automaton state.
c    -( b^{8, 115}_2 ∧  b^{8, 115}_1 ∧  b^{8, 115}_0 ∧ true) 
c  in CNF:
c    -b^{8, 115}_2 ∨ -b^{8, 115}_1 ∨ -b^{8, 115}_0 ∨ false 
c  in DIMACS:
-10550 -10551 -10552  0

c i = 116
c  -2+1 --> -1
c    ( b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧  p_928) -> ( b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0)
c  in CNF:
c    -b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨  b^{8, 117}_2
c    -b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_1
c    -b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨  b^{8, 117}_0
c  in DIMACS:
-10553 -10554  10555 -928  10556 0
-10553 -10554  10555 -928 -10557 0
-10553 -10554  10555 -928  10558 0

c  -1+1 --> 0
c    ( b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0 ∧  p_928) -> (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧ -b^{8, 117}_0)
c  in CNF:
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_2
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_1
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_0
c  in DIMACS:
-10553  10554 -10555 -928 -10556 0
-10553  10554 -10555 -928 -10557 0
-10553  10554 -10555 -928 -10558 0

c  0+1 --> 1
c    (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧  p_928) -> (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0)
c  in CNF:
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_2
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_1
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨  b^{8, 117}_0
c  in DIMACS:
 10553  10554  10555 -928 -10556 0
 10553  10554  10555 -928 -10557 0
 10553  10554  10555 -928  10558 0

c  1+1 --> 2
c    (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0 ∧  p_928) -> (-b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0)
c  in CNF:
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_2
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨  b^{8, 117}_1
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ -p_928 ∨ -b^{8, 117}_0
c  in DIMACS:
 10553  10554 -10555 -928 -10556 0
 10553  10554 -10555 -928  10557 0
 10553  10554 -10555 -928 -10558 0

c  2+1 --> break 
c    (-b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧  p_928) -> break
c  in CNF:
c     b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 10553 -10554  10555 -928 1162 0


c  2-1 --> 1
c    (-b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧ -p_928) -> (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0)
c  in CNF:
c     b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_2
c     b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_1
c     b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨  b^{8, 117}_0
c  in DIMACS:
 10553 -10554  10555  928 -10556 0
 10553 -10554  10555  928 -10557 0
 10553 -10554  10555  928  10558 0

c  1-1 --> 0
c    (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0 ∧ -p_928) -> (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧ -b^{8, 117}_0)
c  in CNF:
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_2
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_1
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_0
c  in DIMACS:
 10553  10554 -10555  928 -10556 0
 10553  10554 -10555  928 -10557 0
 10553  10554 -10555  928 -10558 0

c  0-1 --> -1
c    (-b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧ -p_928) -> ( b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0)
c  in CNF:
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨  b^{8, 117}_2
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_1
c     b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨  b^{8, 117}_0
c  in DIMACS:
 10553  10554  10555  928  10556 0
 10553  10554  10555  928 -10557 0
 10553  10554  10555  928  10558 0

c  -1-1 --> -2
c    ( b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧  b^{8, 116}_0 ∧ -p_928) -> ( b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0)
c  in CNF:
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨  b^{8, 117}_2
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨  b^{8, 117}_1
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨  p_928 ∨ -b^{8, 117}_0
c  in DIMACS:
-10553  10554 -10555  928  10556 0
-10553  10554 -10555  928  10557 0
-10553  10554 -10555  928 -10558 0

c  -2-1 --> break 
c    ( b^{8, 116}_2 ∧  b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨  b^{8, 116}_0 ∨  p_928 ∨ break
c  in DIMACS:
-10553 -10554  10555  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 116}_2 ∧ -b^{8, 116}_1 ∧ -b^{8, 116}_0 ∧ true) 
c  in CNF:
c    -b^{8, 116}_2 ∨  b^{8, 116}_1 ∨  b^{8, 116}_0 ∨ false 
c  in DIMACS:
-10553  10554  10555  0

c  3 does not represent an automaton state.
c    -(-b^{8, 116}_2 ∧  b^{8, 116}_1 ∧  b^{8, 116}_0 ∧ true) 
c  in CNF:
c     b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ false 
c  in DIMACS:
 10553 -10554 -10555  0
c  -3 does not represent an automaton state.
c    -( b^{8, 116}_2 ∧  b^{8, 116}_1 ∧  b^{8, 116}_0 ∧ true) 
c  in CNF:
c    -b^{8, 116}_2 ∨ -b^{8, 116}_1 ∨ -b^{8, 116}_0 ∨ false 
c  in DIMACS:
-10553 -10554 -10555  0

c i = 117
c  -2+1 --> -1
c    ( b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧  p_936) -> ( b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0)
c  in CNF:
c    -b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨  b^{8, 118}_2
c    -b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_1
c    -b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨  b^{8, 118}_0
c  in DIMACS:
-10556 -10557  10558 -936  10559 0
-10556 -10557  10558 -936 -10560 0
-10556 -10557  10558 -936  10561 0

c  -1+1 --> 0
c    ( b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0 ∧  p_936) -> (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧ -b^{8, 118}_0)
c  in CNF:
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_2
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_1
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_0
c  in DIMACS:
-10556  10557 -10558 -936 -10559 0
-10556  10557 -10558 -936 -10560 0
-10556  10557 -10558 -936 -10561 0

c  0+1 --> 1
c    (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧  p_936) -> (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0)
c  in CNF:
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_2
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_1
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨  b^{8, 118}_0
c  in DIMACS:
 10556  10557  10558 -936 -10559 0
 10556  10557  10558 -936 -10560 0
 10556  10557  10558 -936  10561 0

c  1+1 --> 2
c    (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0 ∧  p_936) -> (-b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0)
c  in CNF:
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_2
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨  b^{8, 118}_1
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ -p_936 ∨ -b^{8, 118}_0
c  in DIMACS:
 10556  10557 -10558 -936 -10559 0
 10556  10557 -10558 -936  10560 0
 10556  10557 -10558 -936 -10561 0

c  2+1 --> break 
c    (-b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧  p_936) -> break
c  in CNF:
c     b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 10556 -10557  10558 -936 1162 0


c  2-1 --> 1
c    (-b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧ -p_936) -> (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0)
c  in CNF:
c     b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_2
c     b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_1
c     b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨  b^{8, 118}_0
c  in DIMACS:
 10556 -10557  10558  936 -10559 0
 10556 -10557  10558  936 -10560 0
 10556 -10557  10558  936  10561 0

c  1-1 --> 0
c    (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0 ∧ -p_936) -> (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧ -b^{8, 118}_0)
c  in CNF:
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_2
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_1
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_0
c  in DIMACS:
 10556  10557 -10558  936 -10559 0
 10556  10557 -10558  936 -10560 0
 10556  10557 -10558  936 -10561 0

c  0-1 --> -1
c    (-b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧ -p_936) -> ( b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0)
c  in CNF:
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨  b^{8, 118}_2
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_1
c     b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨  b^{8, 118}_0
c  in DIMACS:
 10556  10557  10558  936  10559 0
 10556  10557  10558  936 -10560 0
 10556  10557  10558  936  10561 0

c  -1-1 --> -2
c    ( b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧  b^{8, 117}_0 ∧ -p_936) -> ( b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0)
c  in CNF:
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨  b^{8, 118}_2
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨  b^{8, 118}_1
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨  p_936 ∨ -b^{8, 118}_0
c  in DIMACS:
-10556  10557 -10558  936  10559 0
-10556  10557 -10558  936  10560 0
-10556  10557 -10558  936 -10561 0

c  -2-1 --> break 
c    ( b^{8, 117}_2 ∧  b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨  b^{8, 117}_0 ∨  p_936 ∨ break
c  in DIMACS:
-10556 -10557  10558  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 117}_2 ∧ -b^{8, 117}_1 ∧ -b^{8, 117}_0 ∧ true) 
c  in CNF:
c    -b^{8, 117}_2 ∨  b^{8, 117}_1 ∨  b^{8, 117}_0 ∨ false 
c  in DIMACS:
-10556  10557  10558  0

c  3 does not represent an automaton state.
c    -(-b^{8, 117}_2 ∧  b^{8, 117}_1 ∧  b^{8, 117}_0 ∧ true) 
c  in CNF:
c     b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ false 
c  in DIMACS:
 10556 -10557 -10558  0
c  -3 does not represent an automaton state.
c    -( b^{8, 117}_2 ∧  b^{8, 117}_1 ∧  b^{8, 117}_0 ∧ true) 
c  in CNF:
c    -b^{8, 117}_2 ∨ -b^{8, 117}_1 ∨ -b^{8, 117}_0 ∨ false 
c  in DIMACS:
-10556 -10557 -10558  0

c i = 118
c  -2+1 --> -1
c    ( b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧  p_944) -> ( b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0)
c  in CNF:
c    -b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨  b^{8, 119}_2
c    -b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_1
c    -b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨  b^{8, 119}_0
c  in DIMACS:
-10559 -10560  10561 -944  10562 0
-10559 -10560  10561 -944 -10563 0
-10559 -10560  10561 -944  10564 0

c  -1+1 --> 0
c    ( b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0 ∧  p_944) -> (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧ -b^{8, 119}_0)
c  in CNF:
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_2
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_1
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_0
c  in DIMACS:
-10559  10560 -10561 -944 -10562 0
-10559  10560 -10561 -944 -10563 0
-10559  10560 -10561 -944 -10564 0

c  0+1 --> 1
c    (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧  p_944) -> (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0)
c  in CNF:
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_2
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_1
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨  b^{8, 119}_0
c  in DIMACS:
 10559  10560  10561 -944 -10562 0
 10559  10560  10561 -944 -10563 0
 10559  10560  10561 -944  10564 0

c  1+1 --> 2
c    (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0 ∧  p_944) -> (-b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0)
c  in CNF:
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_2
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨  b^{8, 119}_1
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ -p_944 ∨ -b^{8, 119}_0
c  in DIMACS:
 10559  10560 -10561 -944 -10562 0
 10559  10560 -10561 -944  10563 0
 10559  10560 -10561 -944 -10564 0

c  2+1 --> break 
c    (-b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧  p_944) -> break
c  in CNF:
c     b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 10559 -10560  10561 -944 1162 0


c  2-1 --> 1
c    (-b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧ -p_944) -> (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0)
c  in CNF:
c     b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_2
c     b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_1
c     b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨  b^{8, 119}_0
c  in DIMACS:
 10559 -10560  10561  944 -10562 0
 10559 -10560  10561  944 -10563 0
 10559 -10560  10561  944  10564 0

c  1-1 --> 0
c    (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0 ∧ -p_944) -> (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧ -b^{8, 119}_0)
c  in CNF:
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_2
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_1
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_0
c  in DIMACS:
 10559  10560 -10561  944 -10562 0
 10559  10560 -10561  944 -10563 0
 10559  10560 -10561  944 -10564 0

c  0-1 --> -1
c    (-b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧ -p_944) -> ( b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0)
c  in CNF:
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨  b^{8, 119}_2
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_1
c     b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨  b^{8, 119}_0
c  in DIMACS:
 10559  10560  10561  944  10562 0
 10559  10560  10561  944 -10563 0
 10559  10560  10561  944  10564 0

c  -1-1 --> -2
c    ( b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧  b^{8, 118}_0 ∧ -p_944) -> ( b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0)
c  in CNF:
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨  b^{8, 119}_2
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨  b^{8, 119}_1
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨  p_944 ∨ -b^{8, 119}_0
c  in DIMACS:
-10559  10560 -10561  944  10562 0
-10559  10560 -10561  944  10563 0
-10559  10560 -10561  944 -10564 0

c  -2-1 --> break 
c    ( b^{8, 118}_2 ∧  b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨  b^{8, 118}_0 ∨  p_944 ∨ break
c  in DIMACS:
-10559 -10560  10561  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 118}_2 ∧ -b^{8, 118}_1 ∧ -b^{8, 118}_0 ∧ true) 
c  in CNF:
c    -b^{8, 118}_2 ∨  b^{8, 118}_1 ∨  b^{8, 118}_0 ∨ false 
c  in DIMACS:
-10559  10560  10561  0

c  3 does not represent an automaton state.
c    -(-b^{8, 118}_2 ∧  b^{8, 118}_1 ∧  b^{8, 118}_0 ∧ true) 
c  in CNF:
c     b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ false 
c  in DIMACS:
 10559 -10560 -10561  0
c  -3 does not represent an automaton state.
c    -( b^{8, 118}_2 ∧  b^{8, 118}_1 ∧  b^{8, 118}_0 ∧ true) 
c  in CNF:
c    -b^{8, 118}_2 ∨ -b^{8, 118}_1 ∨ -b^{8, 118}_0 ∨ false 
c  in DIMACS:
-10559 -10560 -10561  0

c i = 119
c  -2+1 --> -1
c    ( b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧  p_952) -> ( b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0)
c  in CNF:
c    -b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨  b^{8, 120}_2
c    -b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_1
c    -b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨  b^{8, 120}_0
c  in DIMACS:
-10562 -10563  10564 -952  10565 0
-10562 -10563  10564 -952 -10566 0
-10562 -10563  10564 -952  10567 0

c  -1+1 --> 0
c    ( b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0 ∧  p_952) -> (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧ -b^{8, 120}_0)
c  in CNF:
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_2
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_1
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_0
c  in DIMACS:
-10562  10563 -10564 -952 -10565 0
-10562  10563 -10564 -952 -10566 0
-10562  10563 -10564 -952 -10567 0

c  0+1 --> 1
c    (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧  p_952) -> (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0)
c  in CNF:
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_2
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_1
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨  b^{8, 120}_0
c  in DIMACS:
 10562  10563  10564 -952 -10565 0
 10562  10563  10564 -952 -10566 0
 10562  10563  10564 -952  10567 0

c  1+1 --> 2
c    (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0 ∧  p_952) -> (-b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0)
c  in CNF:
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_2
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨  b^{8, 120}_1
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ -p_952 ∨ -b^{8, 120}_0
c  in DIMACS:
 10562  10563 -10564 -952 -10565 0
 10562  10563 -10564 -952  10566 0
 10562  10563 -10564 -952 -10567 0

c  2+1 --> break 
c    (-b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧  p_952) -> break
c  in CNF:
c     b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 10562 -10563  10564 -952 1162 0


c  2-1 --> 1
c    (-b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧ -p_952) -> (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0)
c  in CNF:
c     b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_2
c     b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_1
c     b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨  b^{8, 120}_0
c  in DIMACS:
 10562 -10563  10564  952 -10565 0
 10562 -10563  10564  952 -10566 0
 10562 -10563  10564  952  10567 0

c  1-1 --> 0
c    (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0 ∧ -p_952) -> (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧ -b^{8, 120}_0)
c  in CNF:
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_2
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_1
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_0
c  in DIMACS:
 10562  10563 -10564  952 -10565 0
 10562  10563 -10564  952 -10566 0
 10562  10563 -10564  952 -10567 0

c  0-1 --> -1
c    (-b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧ -p_952) -> ( b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0)
c  in CNF:
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨  b^{8, 120}_2
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_1
c     b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨  b^{8, 120}_0
c  in DIMACS:
 10562  10563  10564  952  10565 0
 10562  10563  10564  952 -10566 0
 10562  10563  10564  952  10567 0

c  -1-1 --> -2
c    ( b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧  b^{8, 119}_0 ∧ -p_952) -> ( b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0)
c  in CNF:
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨  b^{8, 120}_2
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨  b^{8, 120}_1
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨  p_952 ∨ -b^{8, 120}_0
c  in DIMACS:
-10562  10563 -10564  952  10565 0
-10562  10563 -10564  952  10566 0
-10562  10563 -10564  952 -10567 0

c  -2-1 --> break 
c    ( b^{8, 119}_2 ∧  b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨  b^{8, 119}_0 ∨  p_952 ∨ break
c  in DIMACS:
-10562 -10563  10564  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 119}_2 ∧ -b^{8, 119}_1 ∧ -b^{8, 119}_0 ∧ true) 
c  in CNF:
c    -b^{8, 119}_2 ∨  b^{8, 119}_1 ∨  b^{8, 119}_0 ∨ false 
c  in DIMACS:
-10562  10563  10564  0

c  3 does not represent an automaton state.
c    -(-b^{8, 119}_2 ∧  b^{8, 119}_1 ∧  b^{8, 119}_0 ∧ true) 
c  in CNF:
c     b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ false 
c  in DIMACS:
 10562 -10563 -10564  0
c  -3 does not represent an automaton state.
c    -( b^{8, 119}_2 ∧  b^{8, 119}_1 ∧  b^{8, 119}_0 ∧ true) 
c  in CNF:
c    -b^{8, 119}_2 ∨ -b^{8, 119}_1 ∨ -b^{8, 119}_0 ∨ false 
c  in DIMACS:
-10562 -10563 -10564  0

c i = 120
c  -2+1 --> -1
c    ( b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧  p_960) -> ( b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0)
c  in CNF:
c    -b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨  b^{8, 121}_2
c    -b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_1
c    -b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨  b^{8, 121}_0
c  in DIMACS:
-10565 -10566  10567 -960  10568 0
-10565 -10566  10567 -960 -10569 0
-10565 -10566  10567 -960  10570 0

c  -1+1 --> 0
c    ( b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0 ∧  p_960) -> (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧ -b^{8, 121}_0)
c  in CNF:
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_2
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_1
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_0
c  in DIMACS:
-10565  10566 -10567 -960 -10568 0
-10565  10566 -10567 -960 -10569 0
-10565  10566 -10567 -960 -10570 0

c  0+1 --> 1
c    (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧  p_960) -> (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0)
c  in CNF:
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_2
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_1
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨  b^{8, 121}_0
c  in DIMACS:
 10565  10566  10567 -960 -10568 0
 10565  10566  10567 -960 -10569 0
 10565  10566  10567 -960  10570 0

c  1+1 --> 2
c    (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0 ∧  p_960) -> (-b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0)
c  in CNF:
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_2
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨  b^{8, 121}_1
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ -p_960 ∨ -b^{8, 121}_0
c  in DIMACS:
 10565  10566 -10567 -960 -10568 0
 10565  10566 -10567 -960  10569 0
 10565  10566 -10567 -960 -10570 0

c  2+1 --> break 
c    (-b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧  p_960) -> break
c  in CNF:
c     b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 10565 -10566  10567 -960 1162 0


c  2-1 --> 1
c    (-b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧ -p_960) -> (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0)
c  in CNF:
c     b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_2
c     b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_1
c     b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨  b^{8, 121}_0
c  in DIMACS:
 10565 -10566  10567  960 -10568 0
 10565 -10566  10567  960 -10569 0
 10565 -10566  10567  960  10570 0

c  1-1 --> 0
c    (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0 ∧ -p_960) -> (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧ -b^{8, 121}_0)
c  in CNF:
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_2
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_1
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_0
c  in DIMACS:
 10565  10566 -10567  960 -10568 0
 10565  10566 -10567  960 -10569 0
 10565  10566 -10567  960 -10570 0

c  0-1 --> -1
c    (-b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧ -p_960) -> ( b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0)
c  in CNF:
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨  b^{8, 121}_2
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_1
c     b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨  b^{8, 121}_0
c  in DIMACS:
 10565  10566  10567  960  10568 0
 10565  10566  10567  960 -10569 0
 10565  10566  10567  960  10570 0

c  -1-1 --> -2
c    ( b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧  b^{8, 120}_0 ∧ -p_960) -> ( b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0)
c  in CNF:
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨  b^{8, 121}_2
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨  b^{8, 121}_1
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨  p_960 ∨ -b^{8, 121}_0
c  in DIMACS:
-10565  10566 -10567  960  10568 0
-10565  10566 -10567  960  10569 0
-10565  10566 -10567  960 -10570 0

c  -2-1 --> break 
c    ( b^{8, 120}_2 ∧  b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨  b^{8, 120}_0 ∨  p_960 ∨ break
c  in DIMACS:
-10565 -10566  10567  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 120}_2 ∧ -b^{8, 120}_1 ∧ -b^{8, 120}_0 ∧ true) 
c  in CNF:
c    -b^{8, 120}_2 ∨  b^{8, 120}_1 ∨  b^{8, 120}_0 ∨ false 
c  in DIMACS:
-10565  10566  10567  0

c  3 does not represent an automaton state.
c    -(-b^{8, 120}_2 ∧  b^{8, 120}_1 ∧  b^{8, 120}_0 ∧ true) 
c  in CNF:
c     b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ false 
c  in DIMACS:
 10565 -10566 -10567  0
c  -3 does not represent an automaton state.
c    -( b^{8, 120}_2 ∧  b^{8, 120}_1 ∧  b^{8, 120}_0 ∧ true) 
c  in CNF:
c    -b^{8, 120}_2 ∨ -b^{8, 120}_1 ∨ -b^{8, 120}_0 ∨ false 
c  in DIMACS:
-10565 -10566 -10567  0

c i = 121
c  -2+1 --> -1
c    ( b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧  p_968) -> ( b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0)
c  in CNF:
c    -b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨  b^{8, 122}_2
c    -b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_1
c    -b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨  b^{8, 122}_0
c  in DIMACS:
-10568 -10569  10570 -968  10571 0
-10568 -10569  10570 -968 -10572 0
-10568 -10569  10570 -968  10573 0

c  -1+1 --> 0
c    ( b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0 ∧  p_968) -> (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧ -b^{8, 122}_0)
c  in CNF:
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_2
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_1
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_0
c  in DIMACS:
-10568  10569 -10570 -968 -10571 0
-10568  10569 -10570 -968 -10572 0
-10568  10569 -10570 -968 -10573 0

c  0+1 --> 1
c    (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧  p_968) -> (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0)
c  in CNF:
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_2
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_1
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨  b^{8, 122}_0
c  in DIMACS:
 10568  10569  10570 -968 -10571 0
 10568  10569  10570 -968 -10572 0
 10568  10569  10570 -968  10573 0

c  1+1 --> 2
c    (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0 ∧  p_968) -> (-b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0)
c  in CNF:
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_2
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨  b^{8, 122}_1
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ -p_968 ∨ -b^{8, 122}_0
c  in DIMACS:
 10568  10569 -10570 -968 -10571 0
 10568  10569 -10570 -968  10572 0
 10568  10569 -10570 -968 -10573 0

c  2+1 --> break 
c    (-b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧  p_968) -> break
c  in CNF:
c     b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 10568 -10569  10570 -968 1162 0


c  2-1 --> 1
c    (-b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧ -p_968) -> (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0)
c  in CNF:
c     b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_2
c     b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_1
c     b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨  b^{8, 122}_0
c  in DIMACS:
 10568 -10569  10570  968 -10571 0
 10568 -10569  10570  968 -10572 0
 10568 -10569  10570  968  10573 0

c  1-1 --> 0
c    (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0 ∧ -p_968) -> (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧ -b^{8, 122}_0)
c  in CNF:
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_2
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_1
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_0
c  in DIMACS:
 10568  10569 -10570  968 -10571 0
 10568  10569 -10570  968 -10572 0
 10568  10569 -10570  968 -10573 0

c  0-1 --> -1
c    (-b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧ -p_968) -> ( b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0)
c  in CNF:
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨  b^{8, 122}_2
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_1
c     b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨  b^{8, 122}_0
c  in DIMACS:
 10568  10569  10570  968  10571 0
 10568  10569  10570  968 -10572 0
 10568  10569  10570  968  10573 0

c  -1-1 --> -2
c    ( b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧  b^{8, 121}_0 ∧ -p_968) -> ( b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0)
c  in CNF:
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨  b^{8, 122}_2
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨  b^{8, 122}_1
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨  p_968 ∨ -b^{8, 122}_0
c  in DIMACS:
-10568  10569 -10570  968  10571 0
-10568  10569 -10570  968  10572 0
-10568  10569 -10570  968 -10573 0

c  -2-1 --> break 
c    ( b^{8, 121}_2 ∧  b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨  b^{8, 121}_0 ∨  p_968 ∨ break
c  in DIMACS:
-10568 -10569  10570  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 121}_2 ∧ -b^{8, 121}_1 ∧ -b^{8, 121}_0 ∧ true) 
c  in CNF:
c    -b^{8, 121}_2 ∨  b^{8, 121}_1 ∨  b^{8, 121}_0 ∨ false 
c  in DIMACS:
-10568  10569  10570  0

c  3 does not represent an automaton state.
c    -(-b^{8, 121}_2 ∧  b^{8, 121}_1 ∧  b^{8, 121}_0 ∧ true) 
c  in CNF:
c     b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ false 
c  in DIMACS:
 10568 -10569 -10570  0
c  -3 does not represent an automaton state.
c    -( b^{8, 121}_2 ∧  b^{8, 121}_1 ∧  b^{8, 121}_0 ∧ true) 
c  in CNF:
c    -b^{8, 121}_2 ∨ -b^{8, 121}_1 ∨ -b^{8, 121}_0 ∨ false 
c  in DIMACS:
-10568 -10569 -10570  0

c i = 122
c  -2+1 --> -1
c    ( b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧  p_976) -> ( b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0)
c  in CNF:
c    -b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨  b^{8, 123}_2
c    -b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_1
c    -b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨  b^{8, 123}_0
c  in DIMACS:
-10571 -10572  10573 -976  10574 0
-10571 -10572  10573 -976 -10575 0
-10571 -10572  10573 -976  10576 0

c  -1+1 --> 0
c    ( b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0 ∧  p_976) -> (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧ -b^{8, 123}_0)
c  in CNF:
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_2
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_1
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_0
c  in DIMACS:
-10571  10572 -10573 -976 -10574 0
-10571  10572 -10573 -976 -10575 0
-10571  10572 -10573 -976 -10576 0

c  0+1 --> 1
c    (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧  p_976) -> (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0)
c  in CNF:
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_2
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_1
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨  b^{8, 123}_0
c  in DIMACS:
 10571  10572  10573 -976 -10574 0
 10571  10572  10573 -976 -10575 0
 10571  10572  10573 -976  10576 0

c  1+1 --> 2
c    (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0 ∧  p_976) -> (-b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0)
c  in CNF:
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_2
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨  b^{8, 123}_1
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ -p_976 ∨ -b^{8, 123}_0
c  in DIMACS:
 10571  10572 -10573 -976 -10574 0
 10571  10572 -10573 -976  10575 0
 10571  10572 -10573 -976 -10576 0

c  2+1 --> break 
c    (-b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧  p_976) -> break
c  in CNF:
c     b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 10571 -10572  10573 -976 1162 0


c  2-1 --> 1
c    (-b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧ -p_976) -> (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0)
c  in CNF:
c     b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_2
c     b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_1
c     b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨  b^{8, 123}_0
c  in DIMACS:
 10571 -10572  10573  976 -10574 0
 10571 -10572  10573  976 -10575 0
 10571 -10572  10573  976  10576 0

c  1-1 --> 0
c    (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0 ∧ -p_976) -> (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧ -b^{8, 123}_0)
c  in CNF:
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_2
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_1
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_0
c  in DIMACS:
 10571  10572 -10573  976 -10574 0
 10571  10572 -10573  976 -10575 0
 10571  10572 -10573  976 -10576 0

c  0-1 --> -1
c    (-b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧ -p_976) -> ( b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0)
c  in CNF:
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨  b^{8, 123}_2
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_1
c     b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨  b^{8, 123}_0
c  in DIMACS:
 10571  10572  10573  976  10574 0
 10571  10572  10573  976 -10575 0
 10571  10572  10573  976  10576 0

c  -1-1 --> -2
c    ( b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧  b^{8, 122}_0 ∧ -p_976) -> ( b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0)
c  in CNF:
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨  b^{8, 123}_2
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨  b^{8, 123}_1
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨  p_976 ∨ -b^{8, 123}_0
c  in DIMACS:
-10571  10572 -10573  976  10574 0
-10571  10572 -10573  976  10575 0
-10571  10572 -10573  976 -10576 0

c  -2-1 --> break 
c    ( b^{8, 122}_2 ∧  b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨  b^{8, 122}_0 ∨  p_976 ∨ break
c  in DIMACS:
-10571 -10572  10573  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 122}_2 ∧ -b^{8, 122}_1 ∧ -b^{8, 122}_0 ∧ true) 
c  in CNF:
c    -b^{8, 122}_2 ∨  b^{8, 122}_1 ∨  b^{8, 122}_0 ∨ false 
c  in DIMACS:
-10571  10572  10573  0

c  3 does not represent an automaton state.
c    -(-b^{8, 122}_2 ∧  b^{8, 122}_1 ∧  b^{8, 122}_0 ∧ true) 
c  in CNF:
c     b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ false 
c  in DIMACS:
 10571 -10572 -10573  0
c  -3 does not represent an automaton state.
c    -( b^{8, 122}_2 ∧  b^{8, 122}_1 ∧  b^{8, 122}_0 ∧ true) 
c  in CNF:
c    -b^{8, 122}_2 ∨ -b^{8, 122}_1 ∨ -b^{8, 122}_0 ∨ false 
c  in DIMACS:
-10571 -10572 -10573  0

c i = 123
c  -2+1 --> -1
c    ( b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧  p_984) -> ( b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0)
c  in CNF:
c    -b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨  b^{8, 124}_2
c    -b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_1
c    -b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨  b^{8, 124}_0
c  in DIMACS:
-10574 -10575  10576 -984  10577 0
-10574 -10575  10576 -984 -10578 0
-10574 -10575  10576 -984  10579 0

c  -1+1 --> 0
c    ( b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0 ∧  p_984) -> (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧ -b^{8, 124}_0)
c  in CNF:
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_2
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_1
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_0
c  in DIMACS:
-10574  10575 -10576 -984 -10577 0
-10574  10575 -10576 -984 -10578 0
-10574  10575 -10576 -984 -10579 0

c  0+1 --> 1
c    (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧  p_984) -> (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0)
c  in CNF:
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_2
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_1
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨  b^{8, 124}_0
c  in DIMACS:
 10574  10575  10576 -984 -10577 0
 10574  10575  10576 -984 -10578 0
 10574  10575  10576 -984  10579 0

c  1+1 --> 2
c    (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0 ∧  p_984) -> (-b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0)
c  in CNF:
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_2
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨  b^{8, 124}_1
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ -p_984 ∨ -b^{8, 124}_0
c  in DIMACS:
 10574  10575 -10576 -984 -10577 0
 10574  10575 -10576 -984  10578 0
 10574  10575 -10576 -984 -10579 0

c  2+1 --> break 
c    (-b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧  p_984) -> break
c  in CNF:
c     b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 10574 -10575  10576 -984 1162 0


c  2-1 --> 1
c    (-b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧ -p_984) -> (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0)
c  in CNF:
c     b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_2
c     b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_1
c     b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨  b^{8, 124}_0
c  in DIMACS:
 10574 -10575  10576  984 -10577 0
 10574 -10575  10576  984 -10578 0
 10574 -10575  10576  984  10579 0

c  1-1 --> 0
c    (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0 ∧ -p_984) -> (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧ -b^{8, 124}_0)
c  in CNF:
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_2
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_1
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_0
c  in DIMACS:
 10574  10575 -10576  984 -10577 0
 10574  10575 -10576  984 -10578 0
 10574  10575 -10576  984 -10579 0

c  0-1 --> -1
c    (-b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧ -p_984) -> ( b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0)
c  in CNF:
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨  b^{8, 124}_2
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_1
c     b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨  b^{8, 124}_0
c  in DIMACS:
 10574  10575  10576  984  10577 0
 10574  10575  10576  984 -10578 0
 10574  10575  10576  984  10579 0

c  -1-1 --> -2
c    ( b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧  b^{8, 123}_0 ∧ -p_984) -> ( b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0)
c  in CNF:
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨  b^{8, 124}_2
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨  b^{8, 124}_1
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨  p_984 ∨ -b^{8, 124}_0
c  in DIMACS:
-10574  10575 -10576  984  10577 0
-10574  10575 -10576  984  10578 0
-10574  10575 -10576  984 -10579 0

c  -2-1 --> break 
c    ( b^{8, 123}_2 ∧  b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨  b^{8, 123}_0 ∨  p_984 ∨ break
c  in DIMACS:
-10574 -10575  10576  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 123}_2 ∧ -b^{8, 123}_1 ∧ -b^{8, 123}_0 ∧ true) 
c  in CNF:
c    -b^{8, 123}_2 ∨  b^{8, 123}_1 ∨  b^{8, 123}_0 ∨ false 
c  in DIMACS:
-10574  10575  10576  0

c  3 does not represent an automaton state.
c    -(-b^{8, 123}_2 ∧  b^{8, 123}_1 ∧  b^{8, 123}_0 ∧ true) 
c  in CNF:
c     b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ false 
c  in DIMACS:
 10574 -10575 -10576  0
c  -3 does not represent an automaton state.
c    -( b^{8, 123}_2 ∧  b^{8, 123}_1 ∧  b^{8, 123}_0 ∧ true) 
c  in CNF:
c    -b^{8, 123}_2 ∨ -b^{8, 123}_1 ∨ -b^{8, 123}_0 ∨ false 
c  in DIMACS:
-10574 -10575 -10576  0

c i = 124
c  -2+1 --> -1
c    ( b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧  p_992) -> ( b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0)
c  in CNF:
c    -b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨  b^{8, 125}_2
c    -b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_1
c    -b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨  b^{8, 125}_0
c  in DIMACS:
-10577 -10578  10579 -992  10580 0
-10577 -10578  10579 -992 -10581 0
-10577 -10578  10579 -992  10582 0

c  -1+1 --> 0
c    ( b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0 ∧  p_992) -> (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧ -b^{8, 125}_0)
c  in CNF:
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_2
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_1
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_0
c  in DIMACS:
-10577  10578 -10579 -992 -10580 0
-10577  10578 -10579 -992 -10581 0
-10577  10578 -10579 -992 -10582 0

c  0+1 --> 1
c    (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧  p_992) -> (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0)
c  in CNF:
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_2
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_1
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨  b^{8, 125}_0
c  in DIMACS:
 10577  10578  10579 -992 -10580 0
 10577  10578  10579 -992 -10581 0
 10577  10578  10579 -992  10582 0

c  1+1 --> 2
c    (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0 ∧  p_992) -> (-b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0)
c  in CNF:
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_2
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨  b^{8, 125}_1
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ -p_992 ∨ -b^{8, 125}_0
c  in DIMACS:
 10577  10578 -10579 -992 -10580 0
 10577  10578 -10579 -992  10581 0
 10577  10578 -10579 -992 -10582 0

c  2+1 --> break 
c    (-b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧  p_992) -> break
c  in CNF:
c     b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 10577 -10578  10579 -992 1162 0


c  2-1 --> 1
c    (-b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧ -p_992) -> (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0)
c  in CNF:
c     b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_2
c     b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_1
c     b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨  b^{8, 125}_0
c  in DIMACS:
 10577 -10578  10579  992 -10580 0
 10577 -10578  10579  992 -10581 0
 10577 -10578  10579  992  10582 0

c  1-1 --> 0
c    (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0 ∧ -p_992) -> (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧ -b^{8, 125}_0)
c  in CNF:
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_2
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_1
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_0
c  in DIMACS:
 10577  10578 -10579  992 -10580 0
 10577  10578 -10579  992 -10581 0
 10577  10578 -10579  992 -10582 0

c  0-1 --> -1
c    (-b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧ -p_992) -> ( b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0)
c  in CNF:
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨  b^{8, 125}_2
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_1
c     b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨  b^{8, 125}_0
c  in DIMACS:
 10577  10578  10579  992  10580 0
 10577  10578  10579  992 -10581 0
 10577  10578  10579  992  10582 0

c  -1-1 --> -2
c    ( b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧  b^{8, 124}_0 ∧ -p_992) -> ( b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0)
c  in CNF:
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨  b^{8, 125}_2
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨  b^{8, 125}_1
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨  p_992 ∨ -b^{8, 125}_0
c  in DIMACS:
-10577  10578 -10579  992  10580 0
-10577  10578 -10579  992  10581 0
-10577  10578 -10579  992 -10582 0

c  -2-1 --> break 
c    ( b^{8, 124}_2 ∧  b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨  b^{8, 124}_0 ∨  p_992 ∨ break
c  in DIMACS:
-10577 -10578  10579  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 124}_2 ∧ -b^{8, 124}_1 ∧ -b^{8, 124}_0 ∧ true) 
c  in CNF:
c    -b^{8, 124}_2 ∨  b^{8, 124}_1 ∨  b^{8, 124}_0 ∨ false 
c  in DIMACS:
-10577  10578  10579  0

c  3 does not represent an automaton state.
c    -(-b^{8, 124}_2 ∧  b^{8, 124}_1 ∧  b^{8, 124}_0 ∧ true) 
c  in CNF:
c     b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ false 
c  in DIMACS:
 10577 -10578 -10579  0
c  -3 does not represent an automaton state.
c    -( b^{8, 124}_2 ∧  b^{8, 124}_1 ∧  b^{8, 124}_0 ∧ true) 
c  in CNF:
c    -b^{8, 124}_2 ∨ -b^{8, 124}_1 ∨ -b^{8, 124}_0 ∨ false 
c  in DIMACS:
-10577 -10578 -10579  0

c i = 125
c  -2+1 --> -1
c    ( b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧  p_1000) -> ( b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0)
c  in CNF:
c    -b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨  b^{8, 126}_2
c    -b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_1
c    -b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨  b^{8, 126}_0
c  in DIMACS:
-10580 -10581  10582 -1000  10583 0
-10580 -10581  10582 -1000 -10584 0
-10580 -10581  10582 -1000  10585 0

c  -1+1 --> 0
c    ( b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0 ∧  p_1000) -> (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧ -b^{8, 126}_0)
c  in CNF:
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_2
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_1
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_0
c  in DIMACS:
-10580  10581 -10582 -1000 -10583 0
-10580  10581 -10582 -1000 -10584 0
-10580  10581 -10582 -1000 -10585 0

c  0+1 --> 1
c    (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧  p_1000) -> (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0)
c  in CNF:
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_2
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_1
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨  b^{8, 126}_0
c  in DIMACS:
 10580  10581  10582 -1000 -10583 0
 10580  10581  10582 -1000 -10584 0
 10580  10581  10582 -1000  10585 0

c  1+1 --> 2
c    (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0 ∧  p_1000) -> (-b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0)
c  in CNF:
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_2
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨  b^{8, 126}_1
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ -p_1000 ∨ -b^{8, 126}_0
c  in DIMACS:
 10580  10581 -10582 -1000 -10583 0
 10580  10581 -10582 -1000  10584 0
 10580  10581 -10582 -1000 -10585 0

c  2+1 --> break 
c    (-b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 10580 -10581  10582 -1000 1162 0


c  2-1 --> 1
c    (-b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧ -p_1000) -> (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0)
c  in CNF:
c     b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_2
c     b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_1
c     b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨  b^{8, 126}_0
c  in DIMACS:
 10580 -10581  10582  1000 -10583 0
 10580 -10581  10582  1000 -10584 0
 10580 -10581  10582  1000  10585 0

c  1-1 --> 0
c    (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0 ∧ -p_1000) -> (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧ -b^{8, 126}_0)
c  in CNF:
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_2
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_1
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_0
c  in DIMACS:
 10580  10581 -10582  1000 -10583 0
 10580  10581 -10582  1000 -10584 0
 10580  10581 -10582  1000 -10585 0

c  0-1 --> -1
c    (-b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧ -p_1000) -> ( b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0)
c  in CNF:
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨  b^{8, 126}_2
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_1
c     b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨  b^{8, 126}_0
c  in DIMACS:
 10580  10581  10582  1000  10583 0
 10580  10581  10582  1000 -10584 0
 10580  10581  10582  1000  10585 0

c  -1-1 --> -2
c    ( b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧  b^{8, 125}_0 ∧ -p_1000) -> ( b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0)
c  in CNF:
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨  b^{8, 126}_2
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨  b^{8, 126}_1
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨  p_1000 ∨ -b^{8, 126}_0
c  in DIMACS:
-10580  10581 -10582  1000  10583 0
-10580  10581 -10582  1000  10584 0
-10580  10581 -10582  1000 -10585 0

c  -2-1 --> break 
c    ( b^{8, 125}_2 ∧  b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨  b^{8, 125}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-10580 -10581  10582  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 125}_2 ∧ -b^{8, 125}_1 ∧ -b^{8, 125}_0 ∧ true) 
c  in CNF:
c    -b^{8, 125}_2 ∨  b^{8, 125}_1 ∨  b^{8, 125}_0 ∨ false 
c  in DIMACS:
-10580  10581  10582  0

c  3 does not represent an automaton state.
c    -(-b^{8, 125}_2 ∧  b^{8, 125}_1 ∧  b^{8, 125}_0 ∧ true) 
c  in CNF:
c     b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ false 
c  in DIMACS:
 10580 -10581 -10582  0
c  -3 does not represent an automaton state.
c    -( b^{8, 125}_2 ∧  b^{8, 125}_1 ∧  b^{8, 125}_0 ∧ true) 
c  in CNF:
c    -b^{8, 125}_2 ∨ -b^{8, 125}_1 ∨ -b^{8, 125}_0 ∨ false 
c  in DIMACS:
-10580 -10581 -10582  0

c i = 126
c  -2+1 --> -1
c    ( b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧  p_1008) -> ( b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0)
c  in CNF:
c    -b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨  b^{8, 127}_2
c    -b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_1
c    -b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨  b^{8, 127}_0
c  in DIMACS:
-10583 -10584  10585 -1008  10586 0
-10583 -10584  10585 -1008 -10587 0
-10583 -10584  10585 -1008  10588 0

c  -1+1 --> 0
c    ( b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0 ∧  p_1008) -> (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧ -b^{8, 127}_0)
c  in CNF:
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_2
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_1
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_0
c  in DIMACS:
-10583  10584 -10585 -1008 -10586 0
-10583  10584 -10585 -1008 -10587 0
-10583  10584 -10585 -1008 -10588 0

c  0+1 --> 1
c    (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧  p_1008) -> (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0)
c  in CNF:
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_2
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_1
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨  b^{8, 127}_0
c  in DIMACS:
 10583  10584  10585 -1008 -10586 0
 10583  10584  10585 -1008 -10587 0
 10583  10584  10585 -1008  10588 0

c  1+1 --> 2
c    (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0 ∧  p_1008) -> (-b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0)
c  in CNF:
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_2
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨  b^{8, 127}_1
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ -p_1008 ∨ -b^{8, 127}_0
c  in DIMACS:
 10583  10584 -10585 -1008 -10586 0
 10583  10584 -10585 -1008  10587 0
 10583  10584 -10585 -1008 -10588 0

c  2+1 --> break 
c    (-b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 10583 -10584  10585 -1008 1162 0


c  2-1 --> 1
c    (-b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧ -p_1008) -> (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0)
c  in CNF:
c     b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_2
c     b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_1
c     b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨  b^{8, 127}_0
c  in DIMACS:
 10583 -10584  10585  1008 -10586 0
 10583 -10584  10585  1008 -10587 0
 10583 -10584  10585  1008  10588 0

c  1-1 --> 0
c    (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0 ∧ -p_1008) -> (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧ -b^{8, 127}_0)
c  in CNF:
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_2
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_1
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_0
c  in DIMACS:
 10583  10584 -10585  1008 -10586 0
 10583  10584 -10585  1008 -10587 0
 10583  10584 -10585  1008 -10588 0

c  0-1 --> -1
c    (-b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧ -p_1008) -> ( b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0)
c  in CNF:
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨  b^{8, 127}_2
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_1
c     b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨  b^{8, 127}_0
c  in DIMACS:
 10583  10584  10585  1008  10586 0
 10583  10584  10585  1008 -10587 0
 10583  10584  10585  1008  10588 0

c  -1-1 --> -2
c    ( b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧  b^{8, 126}_0 ∧ -p_1008) -> ( b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0)
c  in CNF:
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨  b^{8, 127}_2
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨  b^{8, 127}_1
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨  p_1008 ∨ -b^{8, 127}_0
c  in DIMACS:
-10583  10584 -10585  1008  10586 0
-10583  10584 -10585  1008  10587 0
-10583  10584 -10585  1008 -10588 0

c  -2-1 --> break 
c    ( b^{8, 126}_2 ∧  b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨  b^{8, 126}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-10583 -10584  10585  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 126}_2 ∧ -b^{8, 126}_1 ∧ -b^{8, 126}_0 ∧ true) 
c  in CNF:
c    -b^{8, 126}_2 ∨  b^{8, 126}_1 ∨  b^{8, 126}_0 ∨ false 
c  in DIMACS:
-10583  10584  10585  0

c  3 does not represent an automaton state.
c    -(-b^{8, 126}_2 ∧  b^{8, 126}_1 ∧  b^{8, 126}_0 ∧ true) 
c  in CNF:
c     b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ false 
c  in DIMACS:
 10583 -10584 -10585  0
c  -3 does not represent an automaton state.
c    -( b^{8, 126}_2 ∧  b^{8, 126}_1 ∧  b^{8, 126}_0 ∧ true) 
c  in CNF:
c    -b^{8, 126}_2 ∨ -b^{8, 126}_1 ∨ -b^{8, 126}_0 ∨ false 
c  in DIMACS:
-10583 -10584 -10585  0

c i = 127
c  -2+1 --> -1
c    ( b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧  p_1016) -> ( b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0)
c  in CNF:
c    -b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨  b^{8, 128}_2
c    -b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_1
c    -b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨  b^{8, 128}_0
c  in DIMACS:
-10586 -10587  10588 -1016  10589 0
-10586 -10587  10588 -1016 -10590 0
-10586 -10587  10588 -1016  10591 0

c  -1+1 --> 0
c    ( b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0 ∧  p_1016) -> (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧ -b^{8, 128}_0)
c  in CNF:
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_2
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_1
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_0
c  in DIMACS:
-10586  10587 -10588 -1016 -10589 0
-10586  10587 -10588 -1016 -10590 0
-10586  10587 -10588 -1016 -10591 0

c  0+1 --> 1
c    (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧  p_1016) -> (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0)
c  in CNF:
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_2
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_1
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨  b^{8, 128}_0
c  in DIMACS:
 10586  10587  10588 -1016 -10589 0
 10586  10587  10588 -1016 -10590 0
 10586  10587  10588 -1016  10591 0

c  1+1 --> 2
c    (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0 ∧  p_1016) -> (-b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0)
c  in CNF:
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_2
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨  b^{8, 128}_1
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ -p_1016 ∨ -b^{8, 128}_0
c  in DIMACS:
 10586  10587 -10588 -1016 -10589 0
 10586  10587 -10588 -1016  10590 0
 10586  10587 -10588 -1016 -10591 0

c  2+1 --> break 
c    (-b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 10586 -10587  10588 -1016 1162 0


c  2-1 --> 1
c    (-b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧ -p_1016) -> (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0)
c  in CNF:
c     b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_2
c     b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_1
c     b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨  b^{8, 128}_0
c  in DIMACS:
 10586 -10587  10588  1016 -10589 0
 10586 -10587  10588  1016 -10590 0
 10586 -10587  10588  1016  10591 0

c  1-1 --> 0
c    (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0 ∧ -p_1016) -> (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧ -b^{8, 128}_0)
c  in CNF:
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_2
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_1
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_0
c  in DIMACS:
 10586  10587 -10588  1016 -10589 0
 10586  10587 -10588  1016 -10590 0
 10586  10587 -10588  1016 -10591 0

c  0-1 --> -1
c    (-b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧ -p_1016) -> ( b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0)
c  in CNF:
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨  b^{8, 128}_2
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_1
c     b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨  b^{8, 128}_0
c  in DIMACS:
 10586  10587  10588  1016  10589 0
 10586  10587  10588  1016 -10590 0
 10586  10587  10588  1016  10591 0

c  -1-1 --> -2
c    ( b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧  b^{8, 127}_0 ∧ -p_1016) -> ( b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0)
c  in CNF:
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨  b^{8, 128}_2
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨  b^{8, 128}_1
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨  p_1016 ∨ -b^{8, 128}_0
c  in DIMACS:
-10586  10587 -10588  1016  10589 0
-10586  10587 -10588  1016  10590 0
-10586  10587 -10588  1016 -10591 0

c  -2-1 --> break 
c    ( b^{8, 127}_2 ∧  b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨  b^{8, 127}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-10586 -10587  10588  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 127}_2 ∧ -b^{8, 127}_1 ∧ -b^{8, 127}_0 ∧ true) 
c  in CNF:
c    -b^{8, 127}_2 ∨  b^{8, 127}_1 ∨  b^{8, 127}_0 ∨ false 
c  in DIMACS:
-10586  10587  10588  0

c  3 does not represent an automaton state.
c    -(-b^{8, 127}_2 ∧  b^{8, 127}_1 ∧  b^{8, 127}_0 ∧ true) 
c  in CNF:
c     b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ false 
c  in DIMACS:
 10586 -10587 -10588  0
c  -3 does not represent an automaton state.
c    -( b^{8, 127}_2 ∧  b^{8, 127}_1 ∧  b^{8, 127}_0 ∧ true) 
c  in CNF:
c    -b^{8, 127}_2 ∨ -b^{8, 127}_1 ∨ -b^{8, 127}_0 ∨ false 
c  in DIMACS:
-10586 -10587 -10588  0

c i = 128
c  -2+1 --> -1
c    ( b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧  p_1024) -> ( b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0)
c  in CNF:
c    -b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨  b^{8, 129}_2
c    -b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_1
c    -b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨  b^{8, 129}_0
c  in DIMACS:
-10589 -10590  10591 -1024  10592 0
-10589 -10590  10591 -1024 -10593 0
-10589 -10590  10591 -1024  10594 0

c  -1+1 --> 0
c    ( b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0 ∧  p_1024) -> (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧ -b^{8, 129}_0)
c  in CNF:
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_2
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_1
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_0
c  in DIMACS:
-10589  10590 -10591 -1024 -10592 0
-10589  10590 -10591 -1024 -10593 0
-10589  10590 -10591 -1024 -10594 0

c  0+1 --> 1
c    (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧  p_1024) -> (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0)
c  in CNF:
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_2
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_1
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨  b^{8, 129}_0
c  in DIMACS:
 10589  10590  10591 -1024 -10592 0
 10589  10590  10591 -1024 -10593 0
 10589  10590  10591 -1024  10594 0

c  1+1 --> 2
c    (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0 ∧  p_1024) -> (-b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0)
c  in CNF:
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_2
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨  b^{8, 129}_1
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ -p_1024 ∨ -b^{8, 129}_0
c  in DIMACS:
 10589  10590 -10591 -1024 -10592 0
 10589  10590 -10591 -1024  10593 0
 10589  10590 -10591 -1024 -10594 0

c  2+1 --> break 
c    (-b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 10589 -10590  10591 -1024 1162 0


c  2-1 --> 1
c    (-b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧ -p_1024) -> (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0)
c  in CNF:
c     b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_2
c     b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_1
c     b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨  b^{8, 129}_0
c  in DIMACS:
 10589 -10590  10591  1024 -10592 0
 10589 -10590  10591  1024 -10593 0
 10589 -10590  10591  1024  10594 0

c  1-1 --> 0
c    (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0 ∧ -p_1024) -> (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧ -b^{8, 129}_0)
c  in CNF:
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_2
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_1
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_0
c  in DIMACS:
 10589  10590 -10591  1024 -10592 0
 10589  10590 -10591  1024 -10593 0
 10589  10590 -10591  1024 -10594 0

c  0-1 --> -1
c    (-b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧ -p_1024) -> ( b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0)
c  in CNF:
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨  b^{8, 129}_2
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_1
c     b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨  b^{8, 129}_0
c  in DIMACS:
 10589  10590  10591  1024  10592 0
 10589  10590  10591  1024 -10593 0
 10589  10590  10591  1024  10594 0

c  -1-1 --> -2
c    ( b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧  b^{8, 128}_0 ∧ -p_1024) -> ( b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0)
c  in CNF:
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨  b^{8, 129}_2
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨  b^{8, 129}_1
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨  p_1024 ∨ -b^{8, 129}_0
c  in DIMACS:
-10589  10590 -10591  1024  10592 0
-10589  10590 -10591  1024  10593 0
-10589  10590 -10591  1024 -10594 0

c  -2-1 --> break 
c    ( b^{8, 128}_2 ∧  b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨  b^{8, 128}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-10589 -10590  10591  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 128}_2 ∧ -b^{8, 128}_1 ∧ -b^{8, 128}_0 ∧ true) 
c  in CNF:
c    -b^{8, 128}_2 ∨  b^{8, 128}_1 ∨  b^{8, 128}_0 ∨ false 
c  in DIMACS:
-10589  10590  10591  0

c  3 does not represent an automaton state.
c    -(-b^{8, 128}_2 ∧  b^{8, 128}_1 ∧  b^{8, 128}_0 ∧ true) 
c  in CNF:
c     b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ false 
c  in DIMACS:
 10589 -10590 -10591  0
c  -3 does not represent an automaton state.
c    -( b^{8, 128}_2 ∧  b^{8, 128}_1 ∧  b^{8, 128}_0 ∧ true) 
c  in CNF:
c    -b^{8, 128}_2 ∨ -b^{8, 128}_1 ∨ -b^{8, 128}_0 ∨ false 
c  in DIMACS:
-10589 -10590 -10591  0

c i = 129
c  -2+1 --> -1
c    ( b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧  p_1032) -> ( b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0)
c  in CNF:
c    -b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨  b^{8, 130}_2
c    -b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_1
c    -b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨  b^{8, 130}_0
c  in DIMACS:
-10592 -10593  10594 -1032  10595 0
-10592 -10593  10594 -1032 -10596 0
-10592 -10593  10594 -1032  10597 0

c  -1+1 --> 0
c    ( b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0 ∧  p_1032) -> (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧ -b^{8, 130}_0)
c  in CNF:
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_2
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_1
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_0
c  in DIMACS:
-10592  10593 -10594 -1032 -10595 0
-10592  10593 -10594 -1032 -10596 0
-10592  10593 -10594 -1032 -10597 0

c  0+1 --> 1
c    (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧  p_1032) -> (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0)
c  in CNF:
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_2
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_1
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨  b^{8, 130}_0
c  in DIMACS:
 10592  10593  10594 -1032 -10595 0
 10592  10593  10594 -1032 -10596 0
 10592  10593  10594 -1032  10597 0

c  1+1 --> 2
c    (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0 ∧  p_1032) -> (-b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0)
c  in CNF:
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_2
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨  b^{8, 130}_1
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ -p_1032 ∨ -b^{8, 130}_0
c  in DIMACS:
 10592  10593 -10594 -1032 -10595 0
 10592  10593 -10594 -1032  10596 0
 10592  10593 -10594 -1032 -10597 0

c  2+1 --> break 
c    (-b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 10592 -10593  10594 -1032 1162 0


c  2-1 --> 1
c    (-b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧ -p_1032) -> (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0)
c  in CNF:
c     b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_2
c     b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_1
c     b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨  b^{8, 130}_0
c  in DIMACS:
 10592 -10593  10594  1032 -10595 0
 10592 -10593  10594  1032 -10596 0
 10592 -10593  10594  1032  10597 0

c  1-1 --> 0
c    (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0 ∧ -p_1032) -> (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧ -b^{8, 130}_0)
c  in CNF:
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_2
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_1
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_0
c  in DIMACS:
 10592  10593 -10594  1032 -10595 0
 10592  10593 -10594  1032 -10596 0
 10592  10593 -10594  1032 -10597 0

c  0-1 --> -1
c    (-b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧ -p_1032) -> ( b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0)
c  in CNF:
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨  b^{8, 130}_2
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_1
c     b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨  b^{8, 130}_0
c  in DIMACS:
 10592  10593  10594  1032  10595 0
 10592  10593  10594  1032 -10596 0
 10592  10593  10594  1032  10597 0

c  -1-1 --> -2
c    ( b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧  b^{8, 129}_0 ∧ -p_1032) -> ( b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0)
c  in CNF:
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨  b^{8, 130}_2
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨  b^{8, 130}_1
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨  p_1032 ∨ -b^{8, 130}_0
c  in DIMACS:
-10592  10593 -10594  1032  10595 0
-10592  10593 -10594  1032  10596 0
-10592  10593 -10594  1032 -10597 0

c  -2-1 --> break 
c    ( b^{8, 129}_2 ∧  b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨  b^{8, 129}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-10592 -10593  10594  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 129}_2 ∧ -b^{8, 129}_1 ∧ -b^{8, 129}_0 ∧ true) 
c  in CNF:
c    -b^{8, 129}_2 ∨  b^{8, 129}_1 ∨  b^{8, 129}_0 ∨ false 
c  in DIMACS:
-10592  10593  10594  0

c  3 does not represent an automaton state.
c    -(-b^{8, 129}_2 ∧  b^{8, 129}_1 ∧  b^{8, 129}_0 ∧ true) 
c  in CNF:
c     b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ false 
c  in DIMACS:
 10592 -10593 -10594  0
c  -3 does not represent an automaton state.
c    -( b^{8, 129}_2 ∧  b^{8, 129}_1 ∧  b^{8, 129}_0 ∧ true) 
c  in CNF:
c    -b^{8, 129}_2 ∨ -b^{8, 129}_1 ∨ -b^{8, 129}_0 ∨ false 
c  in DIMACS:
-10592 -10593 -10594  0

c i = 130
c  -2+1 --> -1
c    ( b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧  p_1040) -> ( b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0)
c  in CNF:
c    -b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨  b^{8, 131}_2
c    -b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_1
c    -b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨  b^{8, 131}_0
c  in DIMACS:
-10595 -10596  10597 -1040  10598 0
-10595 -10596  10597 -1040 -10599 0
-10595 -10596  10597 -1040  10600 0

c  -1+1 --> 0
c    ( b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0 ∧  p_1040) -> (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧ -b^{8, 131}_0)
c  in CNF:
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_2
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_1
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_0
c  in DIMACS:
-10595  10596 -10597 -1040 -10598 0
-10595  10596 -10597 -1040 -10599 0
-10595  10596 -10597 -1040 -10600 0

c  0+1 --> 1
c    (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧  p_1040) -> (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0)
c  in CNF:
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_2
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_1
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨  b^{8, 131}_0
c  in DIMACS:
 10595  10596  10597 -1040 -10598 0
 10595  10596  10597 -1040 -10599 0
 10595  10596  10597 -1040  10600 0

c  1+1 --> 2
c    (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0 ∧  p_1040) -> (-b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0)
c  in CNF:
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_2
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨  b^{8, 131}_1
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ -p_1040 ∨ -b^{8, 131}_0
c  in DIMACS:
 10595  10596 -10597 -1040 -10598 0
 10595  10596 -10597 -1040  10599 0
 10595  10596 -10597 -1040 -10600 0

c  2+1 --> break 
c    (-b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 10595 -10596  10597 -1040 1162 0


c  2-1 --> 1
c    (-b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧ -p_1040) -> (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0)
c  in CNF:
c     b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_2
c     b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_1
c     b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨  b^{8, 131}_0
c  in DIMACS:
 10595 -10596  10597  1040 -10598 0
 10595 -10596  10597  1040 -10599 0
 10595 -10596  10597  1040  10600 0

c  1-1 --> 0
c    (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0 ∧ -p_1040) -> (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧ -b^{8, 131}_0)
c  in CNF:
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_2
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_1
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_0
c  in DIMACS:
 10595  10596 -10597  1040 -10598 0
 10595  10596 -10597  1040 -10599 0
 10595  10596 -10597  1040 -10600 0

c  0-1 --> -1
c    (-b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧ -p_1040) -> ( b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0)
c  in CNF:
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨  b^{8, 131}_2
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_1
c     b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨  b^{8, 131}_0
c  in DIMACS:
 10595  10596  10597  1040  10598 0
 10595  10596  10597  1040 -10599 0
 10595  10596  10597  1040  10600 0

c  -1-1 --> -2
c    ( b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧  b^{8, 130}_0 ∧ -p_1040) -> ( b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0)
c  in CNF:
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨  b^{8, 131}_2
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨  b^{8, 131}_1
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨  p_1040 ∨ -b^{8, 131}_0
c  in DIMACS:
-10595  10596 -10597  1040  10598 0
-10595  10596 -10597  1040  10599 0
-10595  10596 -10597  1040 -10600 0

c  -2-1 --> break 
c    ( b^{8, 130}_2 ∧  b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨  b^{8, 130}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-10595 -10596  10597  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 130}_2 ∧ -b^{8, 130}_1 ∧ -b^{8, 130}_0 ∧ true) 
c  in CNF:
c    -b^{8, 130}_2 ∨  b^{8, 130}_1 ∨  b^{8, 130}_0 ∨ false 
c  in DIMACS:
-10595  10596  10597  0

c  3 does not represent an automaton state.
c    -(-b^{8, 130}_2 ∧  b^{8, 130}_1 ∧  b^{8, 130}_0 ∧ true) 
c  in CNF:
c     b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ false 
c  in DIMACS:
 10595 -10596 -10597  0
c  -3 does not represent an automaton state.
c    -( b^{8, 130}_2 ∧  b^{8, 130}_1 ∧  b^{8, 130}_0 ∧ true) 
c  in CNF:
c    -b^{8, 130}_2 ∨ -b^{8, 130}_1 ∨ -b^{8, 130}_0 ∨ false 
c  in DIMACS:
-10595 -10596 -10597  0

c i = 131
c  -2+1 --> -1
c    ( b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧  p_1048) -> ( b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0)
c  in CNF:
c    -b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨  b^{8, 132}_2
c    -b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_1
c    -b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨  b^{8, 132}_0
c  in DIMACS:
-10598 -10599  10600 -1048  10601 0
-10598 -10599  10600 -1048 -10602 0
-10598 -10599  10600 -1048  10603 0

c  -1+1 --> 0
c    ( b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0 ∧  p_1048) -> (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧ -b^{8, 132}_0)
c  in CNF:
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_2
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_1
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_0
c  in DIMACS:
-10598  10599 -10600 -1048 -10601 0
-10598  10599 -10600 -1048 -10602 0
-10598  10599 -10600 -1048 -10603 0

c  0+1 --> 1
c    (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧  p_1048) -> (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0)
c  in CNF:
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_2
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_1
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨  b^{8, 132}_0
c  in DIMACS:
 10598  10599  10600 -1048 -10601 0
 10598  10599  10600 -1048 -10602 0
 10598  10599  10600 -1048  10603 0

c  1+1 --> 2
c    (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0 ∧  p_1048) -> (-b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0)
c  in CNF:
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_2
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨  b^{8, 132}_1
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ -p_1048 ∨ -b^{8, 132}_0
c  in DIMACS:
 10598  10599 -10600 -1048 -10601 0
 10598  10599 -10600 -1048  10602 0
 10598  10599 -10600 -1048 -10603 0

c  2+1 --> break 
c    (-b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 10598 -10599  10600 -1048 1162 0


c  2-1 --> 1
c    (-b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧ -p_1048) -> (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0)
c  in CNF:
c     b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_2
c     b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_1
c     b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨  b^{8, 132}_0
c  in DIMACS:
 10598 -10599  10600  1048 -10601 0
 10598 -10599  10600  1048 -10602 0
 10598 -10599  10600  1048  10603 0

c  1-1 --> 0
c    (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0 ∧ -p_1048) -> (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧ -b^{8, 132}_0)
c  in CNF:
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_2
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_1
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_0
c  in DIMACS:
 10598  10599 -10600  1048 -10601 0
 10598  10599 -10600  1048 -10602 0
 10598  10599 -10600  1048 -10603 0

c  0-1 --> -1
c    (-b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧ -p_1048) -> ( b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0)
c  in CNF:
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨  b^{8, 132}_2
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_1
c     b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨  b^{8, 132}_0
c  in DIMACS:
 10598  10599  10600  1048  10601 0
 10598  10599  10600  1048 -10602 0
 10598  10599  10600  1048  10603 0

c  -1-1 --> -2
c    ( b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧  b^{8, 131}_0 ∧ -p_1048) -> ( b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0)
c  in CNF:
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨  b^{8, 132}_2
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨  b^{8, 132}_1
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨  p_1048 ∨ -b^{8, 132}_0
c  in DIMACS:
-10598  10599 -10600  1048  10601 0
-10598  10599 -10600  1048  10602 0
-10598  10599 -10600  1048 -10603 0

c  -2-1 --> break 
c    ( b^{8, 131}_2 ∧  b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨  b^{8, 131}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-10598 -10599  10600  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 131}_2 ∧ -b^{8, 131}_1 ∧ -b^{8, 131}_0 ∧ true) 
c  in CNF:
c    -b^{8, 131}_2 ∨  b^{8, 131}_1 ∨  b^{8, 131}_0 ∨ false 
c  in DIMACS:
-10598  10599  10600  0

c  3 does not represent an automaton state.
c    -(-b^{8, 131}_2 ∧  b^{8, 131}_1 ∧  b^{8, 131}_0 ∧ true) 
c  in CNF:
c     b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ false 
c  in DIMACS:
 10598 -10599 -10600  0
c  -3 does not represent an automaton state.
c    -( b^{8, 131}_2 ∧  b^{8, 131}_1 ∧  b^{8, 131}_0 ∧ true) 
c  in CNF:
c    -b^{8, 131}_2 ∨ -b^{8, 131}_1 ∨ -b^{8, 131}_0 ∨ false 
c  in DIMACS:
-10598 -10599 -10600  0

c i = 132
c  -2+1 --> -1
c    ( b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧  p_1056) -> ( b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0)
c  in CNF:
c    -b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨  b^{8, 133}_2
c    -b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_1
c    -b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨  b^{8, 133}_0
c  in DIMACS:
-10601 -10602  10603 -1056  10604 0
-10601 -10602  10603 -1056 -10605 0
-10601 -10602  10603 -1056  10606 0

c  -1+1 --> 0
c    ( b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0 ∧  p_1056) -> (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧ -b^{8, 133}_0)
c  in CNF:
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_2
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_1
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_0
c  in DIMACS:
-10601  10602 -10603 -1056 -10604 0
-10601  10602 -10603 -1056 -10605 0
-10601  10602 -10603 -1056 -10606 0

c  0+1 --> 1
c    (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧  p_1056) -> (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0)
c  in CNF:
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_2
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_1
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨  b^{8, 133}_0
c  in DIMACS:
 10601  10602  10603 -1056 -10604 0
 10601  10602  10603 -1056 -10605 0
 10601  10602  10603 -1056  10606 0

c  1+1 --> 2
c    (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0 ∧  p_1056) -> (-b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0)
c  in CNF:
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_2
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨  b^{8, 133}_1
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ -p_1056 ∨ -b^{8, 133}_0
c  in DIMACS:
 10601  10602 -10603 -1056 -10604 0
 10601  10602 -10603 -1056  10605 0
 10601  10602 -10603 -1056 -10606 0

c  2+1 --> break 
c    (-b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 10601 -10602  10603 -1056 1162 0


c  2-1 --> 1
c    (-b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧ -p_1056) -> (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0)
c  in CNF:
c     b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_2
c     b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_1
c     b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨  b^{8, 133}_0
c  in DIMACS:
 10601 -10602  10603  1056 -10604 0
 10601 -10602  10603  1056 -10605 0
 10601 -10602  10603  1056  10606 0

c  1-1 --> 0
c    (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0 ∧ -p_1056) -> (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧ -b^{8, 133}_0)
c  in CNF:
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_2
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_1
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_0
c  in DIMACS:
 10601  10602 -10603  1056 -10604 0
 10601  10602 -10603  1056 -10605 0
 10601  10602 -10603  1056 -10606 0

c  0-1 --> -1
c    (-b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧ -p_1056) -> ( b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0)
c  in CNF:
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨  b^{8, 133}_2
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_1
c     b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨  b^{8, 133}_0
c  in DIMACS:
 10601  10602  10603  1056  10604 0
 10601  10602  10603  1056 -10605 0
 10601  10602  10603  1056  10606 0

c  -1-1 --> -2
c    ( b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧  b^{8, 132}_0 ∧ -p_1056) -> ( b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0)
c  in CNF:
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨  b^{8, 133}_2
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨  b^{8, 133}_1
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨  p_1056 ∨ -b^{8, 133}_0
c  in DIMACS:
-10601  10602 -10603  1056  10604 0
-10601  10602 -10603  1056  10605 0
-10601  10602 -10603  1056 -10606 0

c  -2-1 --> break 
c    ( b^{8, 132}_2 ∧  b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨  b^{8, 132}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-10601 -10602  10603  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 132}_2 ∧ -b^{8, 132}_1 ∧ -b^{8, 132}_0 ∧ true) 
c  in CNF:
c    -b^{8, 132}_2 ∨  b^{8, 132}_1 ∨  b^{8, 132}_0 ∨ false 
c  in DIMACS:
-10601  10602  10603  0

c  3 does not represent an automaton state.
c    -(-b^{8, 132}_2 ∧  b^{8, 132}_1 ∧  b^{8, 132}_0 ∧ true) 
c  in CNF:
c     b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ false 
c  in DIMACS:
 10601 -10602 -10603  0
c  -3 does not represent an automaton state.
c    -( b^{8, 132}_2 ∧  b^{8, 132}_1 ∧  b^{8, 132}_0 ∧ true) 
c  in CNF:
c    -b^{8, 132}_2 ∨ -b^{8, 132}_1 ∨ -b^{8, 132}_0 ∨ false 
c  in DIMACS:
-10601 -10602 -10603  0

c i = 133
c  -2+1 --> -1
c    ( b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧  p_1064) -> ( b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0)
c  in CNF:
c    -b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨  b^{8, 134}_2
c    -b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_1
c    -b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨  b^{8, 134}_0
c  in DIMACS:
-10604 -10605  10606 -1064  10607 0
-10604 -10605  10606 -1064 -10608 0
-10604 -10605  10606 -1064  10609 0

c  -1+1 --> 0
c    ( b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0 ∧  p_1064) -> (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧ -b^{8, 134}_0)
c  in CNF:
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_2
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_1
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_0
c  in DIMACS:
-10604  10605 -10606 -1064 -10607 0
-10604  10605 -10606 -1064 -10608 0
-10604  10605 -10606 -1064 -10609 0

c  0+1 --> 1
c    (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧  p_1064) -> (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0)
c  in CNF:
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_2
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_1
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨  b^{8, 134}_0
c  in DIMACS:
 10604  10605  10606 -1064 -10607 0
 10604  10605  10606 -1064 -10608 0
 10604  10605  10606 -1064  10609 0

c  1+1 --> 2
c    (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0 ∧  p_1064) -> (-b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0)
c  in CNF:
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_2
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨  b^{8, 134}_1
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ -p_1064 ∨ -b^{8, 134}_0
c  in DIMACS:
 10604  10605 -10606 -1064 -10607 0
 10604  10605 -10606 -1064  10608 0
 10604  10605 -10606 -1064 -10609 0

c  2+1 --> break 
c    (-b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 10604 -10605  10606 -1064 1162 0


c  2-1 --> 1
c    (-b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧ -p_1064) -> (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0)
c  in CNF:
c     b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_2
c     b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_1
c     b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨  b^{8, 134}_0
c  in DIMACS:
 10604 -10605  10606  1064 -10607 0
 10604 -10605  10606  1064 -10608 0
 10604 -10605  10606  1064  10609 0

c  1-1 --> 0
c    (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0 ∧ -p_1064) -> (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧ -b^{8, 134}_0)
c  in CNF:
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_2
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_1
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_0
c  in DIMACS:
 10604  10605 -10606  1064 -10607 0
 10604  10605 -10606  1064 -10608 0
 10604  10605 -10606  1064 -10609 0

c  0-1 --> -1
c    (-b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧ -p_1064) -> ( b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0)
c  in CNF:
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨  b^{8, 134}_2
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_1
c     b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨  b^{8, 134}_0
c  in DIMACS:
 10604  10605  10606  1064  10607 0
 10604  10605  10606  1064 -10608 0
 10604  10605  10606  1064  10609 0

c  -1-1 --> -2
c    ( b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧  b^{8, 133}_0 ∧ -p_1064) -> ( b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0)
c  in CNF:
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨  b^{8, 134}_2
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨  b^{8, 134}_1
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨  p_1064 ∨ -b^{8, 134}_0
c  in DIMACS:
-10604  10605 -10606  1064  10607 0
-10604  10605 -10606  1064  10608 0
-10604  10605 -10606  1064 -10609 0

c  -2-1 --> break 
c    ( b^{8, 133}_2 ∧  b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨  b^{8, 133}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-10604 -10605  10606  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 133}_2 ∧ -b^{8, 133}_1 ∧ -b^{8, 133}_0 ∧ true) 
c  in CNF:
c    -b^{8, 133}_2 ∨  b^{8, 133}_1 ∨  b^{8, 133}_0 ∨ false 
c  in DIMACS:
-10604  10605  10606  0

c  3 does not represent an automaton state.
c    -(-b^{8, 133}_2 ∧  b^{8, 133}_1 ∧  b^{8, 133}_0 ∧ true) 
c  in CNF:
c     b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ false 
c  in DIMACS:
 10604 -10605 -10606  0
c  -3 does not represent an automaton state.
c    -( b^{8, 133}_2 ∧  b^{8, 133}_1 ∧  b^{8, 133}_0 ∧ true) 
c  in CNF:
c    -b^{8, 133}_2 ∨ -b^{8, 133}_1 ∨ -b^{8, 133}_0 ∨ false 
c  in DIMACS:
-10604 -10605 -10606  0

c i = 134
c  -2+1 --> -1
c    ( b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧  p_1072) -> ( b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0)
c  in CNF:
c    -b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨  b^{8, 135}_2
c    -b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_1
c    -b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨  b^{8, 135}_0
c  in DIMACS:
-10607 -10608  10609 -1072  10610 0
-10607 -10608  10609 -1072 -10611 0
-10607 -10608  10609 -1072  10612 0

c  -1+1 --> 0
c    ( b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0 ∧  p_1072) -> (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧ -b^{8, 135}_0)
c  in CNF:
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_2
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_1
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_0
c  in DIMACS:
-10607  10608 -10609 -1072 -10610 0
-10607  10608 -10609 -1072 -10611 0
-10607  10608 -10609 -1072 -10612 0

c  0+1 --> 1
c    (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧  p_1072) -> (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0)
c  in CNF:
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_2
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_1
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨  b^{8, 135}_0
c  in DIMACS:
 10607  10608  10609 -1072 -10610 0
 10607  10608  10609 -1072 -10611 0
 10607  10608  10609 -1072  10612 0

c  1+1 --> 2
c    (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0 ∧  p_1072) -> (-b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0)
c  in CNF:
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_2
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨  b^{8, 135}_1
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ -p_1072 ∨ -b^{8, 135}_0
c  in DIMACS:
 10607  10608 -10609 -1072 -10610 0
 10607  10608 -10609 -1072  10611 0
 10607  10608 -10609 -1072 -10612 0

c  2+1 --> break 
c    (-b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 10607 -10608  10609 -1072 1162 0


c  2-1 --> 1
c    (-b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧ -p_1072) -> (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0)
c  in CNF:
c     b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_2
c     b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_1
c     b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨  b^{8, 135}_0
c  in DIMACS:
 10607 -10608  10609  1072 -10610 0
 10607 -10608  10609  1072 -10611 0
 10607 -10608  10609  1072  10612 0

c  1-1 --> 0
c    (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0 ∧ -p_1072) -> (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧ -b^{8, 135}_0)
c  in CNF:
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_2
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_1
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_0
c  in DIMACS:
 10607  10608 -10609  1072 -10610 0
 10607  10608 -10609  1072 -10611 0
 10607  10608 -10609  1072 -10612 0

c  0-1 --> -1
c    (-b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧ -p_1072) -> ( b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0)
c  in CNF:
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨  b^{8, 135}_2
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_1
c     b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨  b^{8, 135}_0
c  in DIMACS:
 10607  10608  10609  1072  10610 0
 10607  10608  10609  1072 -10611 0
 10607  10608  10609  1072  10612 0

c  -1-1 --> -2
c    ( b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧  b^{8, 134}_0 ∧ -p_1072) -> ( b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0)
c  in CNF:
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨  b^{8, 135}_2
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨  b^{8, 135}_1
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨  p_1072 ∨ -b^{8, 135}_0
c  in DIMACS:
-10607  10608 -10609  1072  10610 0
-10607  10608 -10609  1072  10611 0
-10607  10608 -10609  1072 -10612 0

c  -2-1 --> break 
c    ( b^{8, 134}_2 ∧  b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨  b^{8, 134}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-10607 -10608  10609  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 134}_2 ∧ -b^{8, 134}_1 ∧ -b^{8, 134}_0 ∧ true) 
c  in CNF:
c    -b^{8, 134}_2 ∨  b^{8, 134}_1 ∨  b^{8, 134}_0 ∨ false 
c  in DIMACS:
-10607  10608  10609  0

c  3 does not represent an automaton state.
c    -(-b^{8, 134}_2 ∧  b^{8, 134}_1 ∧  b^{8, 134}_0 ∧ true) 
c  in CNF:
c     b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ false 
c  in DIMACS:
 10607 -10608 -10609  0
c  -3 does not represent an automaton state.
c    -( b^{8, 134}_2 ∧  b^{8, 134}_1 ∧  b^{8, 134}_0 ∧ true) 
c  in CNF:
c    -b^{8, 134}_2 ∨ -b^{8, 134}_1 ∨ -b^{8, 134}_0 ∨ false 
c  in DIMACS:
-10607 -10608 -10609  0

c i = 135
c  -2+1 --> -1
c    ( b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧  p_1080) -> ( b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0)
c  in CNF:
c    -b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨  b^{8, 136}_2
c    -b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_1
c    -b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨  b^{8, 136}_0
c  in DIMACS:
-10610 -10611  10612 -1080  10613 0
-10610 -10611  10612 -1080 -10614 0
-10610 -10611  10612 -1080  10615 0

c  -1+1 --> 0
c    ( b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0 ∧  p_1080) -> (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧ -b^{8, 136}_0)
c  in CNF:
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_2
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_1
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_0
c  in DIMACS:
-10610  10611 -10612 -1080 -10613 0
-10610  10611 -10612 -1080 -10614 0
-10610  10611 -10612 -1080 -10615 0

c  0+1 --> 1
c    (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧  p_1080) -> (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0)
c  in CNF:
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_2
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_1
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨  b^{8, 136}_0
c  in DIMACS:
 10610  10611  10612 -1080 -10613 0
 10610  10611  10612 -1080 -10614 0
 10610  10611  10612 -1080  10615 0

c  1+1 --> 2
c    (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0 ∧  p_1080) -> (-b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0)
c  in CNF:
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_2
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨  b^{8, 136}_1
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ -p_1080 ∨ -b^{8, 136}_0
c  in DIMACS:
 10610  10611 -10612 -1080 -10613 0
 10610  10611 -10612 -1080  10614 0
 10610  10611 -10612 -1080 -10615 0

c  2+1 --> break 
c    (-b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 10610 -10611  10612 -1080 1162 0


c  2-1 --> 1
c    (-b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧ -p_1080) -> (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0)
c  in CNF:
c     b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_2
c     b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_1
c     b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨  b^{8, 136}_0
c  in DIMACS:
 10610 -10611  10612  1080 -10613 0
 10610 -10611  10612  1080 -10614 0
 10610 -10611  10612  1080  10615 0

c  1-1 --> 0
c    (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0 ∧ -p_1080) -> (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧ -b^{8, 136}_0)
c  in CNF:
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_2
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_1
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_0
c  in DIMACS:
 10610  10611 -10612  1080 -10613 0
 10610  10611 -10612  1080 -10614 0
 10610  10611 -10612  1080 -10615 0

c  0-1 --> -1
c    (-b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧ -p_1080) -> ( b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0)
c  in CNF:
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨  b^{8, 136}_2
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_1
c     b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨  b^{8, 136}_0
c  in DIMACS:
 10610  10611  10612  1080  10613 0
 10610  10611  10612  1080 -10614 0
 10610  10611  10612  1080  10615 0

c  -1-1 --> -2
c    ( b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧  b^{8, 135}_0 ∧ -p_1080) -> ( b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0)
c  in CNF:
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨  b^{8, 136}_2
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨  b^{8, 136}_1
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨  p_1080 ∨ -b^{8, 136}_0
c  in DIMACS:
-10610  10611 -10612  1080  10613 0
-10610  10611 -10612  1080  10614 0
-10610  10611 -10612  1080 -10615 0

c  -2-1 --> break 
c    ( b^{8, 135}_2 ∧  b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨  b^{8, 135}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-10610 -10611  10612  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 135}_2 ∧ -b^{8, 135}_1 ∧ -b^{8, 135}_0 ∧ true) 
c  in CNF:
c    -b^{8, 135}_2 ∨  b^{8, 135}_1 ∨  b^{8, 135}_0 ∨ false 
c  in DIMACS:
-10610  10611  10612  0

c  3 does not represent an automaton state.
c    -(-b^{8, 135}_2 ∧  b^{8, 135}_1 ∧  b^{8, 135}_0 ∧ true) 
c  in CNF:
c     b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ false 
c  in DIMACS:
 10610 -10611 -10612  0
c  -3 does not represent an automaton state.
c    -( b^{8, 135}_2 ∧  b^{8, 135}_1 ∧  b^{8, 135}_0 ∧ true) 
c  in CNF:
c    -b^{8, 135}_2 ∨ -b^{8, 135}_1 ∨ -b^{8, 135}_0 ∨ false 
c  in DIMACS:
-10610 -10611 -10612  0

c i = 136
c  -2+1 --> -1
c    ( b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧  p_1088) -> ( b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0)
c  in CNF:
c    -b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨  b^{8, 137}_2
c    -b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_1
c    -b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨  b^{8, 137}_0
c  in DIMACS:
-10613 -10614  10615 -1088  10616 0
-10613 -10614  10615 -1088 -10617 0
-10613 -10614  10615 -1088  10618 0

c  -1+1 --> 0
c    ( b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0 ∧  p_1088) -> (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧ -b^{8, 137}_0)
c  in CNF:
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_2
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_1
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_0
c  in DIMACS:
-10613  10614 -10615 -1088 -10616 0
-10613  10614 -10615 -1088 -10617 0
-10613  10614 -10615 -1088 -10618 0

c  0+1 --> 1
c    (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧  p_1088) -> (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0)
c  in CNF:
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_2
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_1
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨  b^{8, 137}_0
c  in DIMACS:
 10613  10614  10615 -1088 -10616 0
 10613  10614  10615 -1088 -10617 0
 10613  10614  10615 -1088  10618 0

c  1+1 --> 2
c    (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0 ∧  p_1088) -> (-b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0)
c  in CNF:
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_2
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨  b^{8, 137}_1
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ -p_1088 ∨ -b^{8, 137}_0
c  in DIMACS:
 10613  10614 -10615 -1088 -10616 0
 10613  10614 -10615 -1088  10617 0
 10613  10614 -10615 -1088 -10618 0

c  2+1 --> break 
c    (-b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 10613 -10614  10615 -1088 1162 0


c  2-1 --> 1
c    (-b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧ -p_1088) -> (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0)
c  in CNF:
c     b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_2
c     b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_1
c     b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨  b^{8, 137}_0
c  in DIMACS:
 10613 -10614  10615  1088 -10616 0
 10613 -10614  10615  1088 -10617 0
 10613 -10614  10615  1088  10618 0

c  1-1 --> 0
c    (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0 ∧ -p_1088) -> (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧ -b^{8, 137}_0)
c  in CNF:
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_2
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_1
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_0
c  in DIMACS:
 10613  10614 -10615  1088 -10616 0
 10613  10614 -10615  1088 -10617 0
 10613  10614 -10615  1088 -10618 0

c  0-1 --> -1
c    (-b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧ -p_1088) -> ( b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0)
c  in CNF:
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨  b^{8, 137}_2
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_1
c     b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨  b^{8, 137}_0
c  in DIMACS:
 10613  10614  10615  1088  10616 0
 10613  10614  10615  1088 -10617 0
 10613  10614  10615  1088  10618 0

c  -1-1 --> -2
c    ( b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧  b^{8, 136}_0 ∧ -p_1088) -> ( b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0)
c  in CNF:
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨  b^{8, 137}_2
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨  b^{8, 137}_1
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨  p_1088 ∨ -b^{8, 137}_0
c  in DIMACS:
-10613  10614 -10615  1088  10616 0
-10613  10614 -10615  1088  10617 0
-10613  10614 -10615  1088 -10618 0

c  -2-1 --> break 
c    ( b^{8, 136}_2 ∧  b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨  b^{8, 136}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-10613 -10614  10615  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 136}_2 ∧ -b^{8, 136}_1 ∧ -b^{8, 136}_0 ∧ true) 
c  in CNF:
c    -b^{8, 136}_2 ∨  b^{8, 136}_1 ∨  b^{8, 136}_0 ∨ false 
c  in DIMACS:
-10613  10614  10615  0

c  3 does not represent an automaton state.
c    -(-b^{8, 136}_2 ∧  b^{8, 136}_1 ∧  b^{8, 136}_0 ∧ true) 
c  in CNF:
c     b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ false 
c  in DIMACS:
 10613 -10614 -10615  0
c  -3 does not represent an automaton state.
c    -( b^{8, 136}_2 ∧  b^{8, 136}_1 ∧  b^{8, 136}_0 ∧ true) 
c  in CNF:
c    -b^{8, 136}_2 ∨ -b^{8, 136}_1 ∨ -b^{8, 136}_0 ∨ false 
c  in DIMACS:
-10613 -10614 -10615  0

c i = 137
c  -2+1 --> -1
c    ( b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧  p_1096) -> ( b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0)
c  in CNF:
c    -b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨  b^{8, 138}_2
c    -b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_1
c    -b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨  b^{8, 138}_0
c  in DIMACS:
-10616 -10617  10618 -1096  10619 0
-10616 -10617  10618 -1096 -10620 0
-10616 -10617  10618 -1096  10621 0

c  -1+1 --> 0
c    ( b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0 ∧  p_1096) -> (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧ -b^{8, 138}_0)
c  in CNF:
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_2
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_1
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_0
c  in DIMACS:
-10616  10617 -10618 -1096 -10619 0
-10616  10617 -10618 -1096 -10620 0
-10616  10617 -10618 -1096 -10621 0

c  0+1 --> 1
c    (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧  p_1096) -> (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0)
c  in CNF:
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_2
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_1
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨  b^{8, 138}_0
c  in DIMACS:
 10616  10617  10618 -1096 -10619 0
 10616  10617  10618 -1096 -10620 0
 10616  10617  10618 -1096  10621 0

c  1+1 --> 2
c    (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0 ∧  p_1096) -> (-b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0)
c  in CNF:
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_2
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨  b^{8, 138}_1
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ -p_1096 ∨ -b^{8, 138}_0
c  in DIMACS:
 10616  10617 -10618 -1096 -10619 0
 10616  10617 -10618 -1096  10620 0
 10616  10617 -10618 -1096 -10621 0

c  2+1 --> break 
c    (-b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 10616 -10617  10618 -1096 1162 0


c  2-1 --> 1
c    (-b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧ -p_1096) -> (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0)
c  in CNF:
c     b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_2
c     b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_1
c     b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨  b^{8, 138}_0
c  in DIMACS:
 10616 -10617  10618  1096 -10619 0
 10616 -10617  10618  1096 -10620 0
 10616 -10617  10618  1096  10621 0

c  1-1 --> 0
c    (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0 ∧ -p_1096) -> (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧ -b^{8, 138}_0)
c  in CNF:
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_2
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_1
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_0
c  in DIMACS:
 10616  10617 -10618  1096 -10619 0
 10616  10617 -10618  1096 -10620 0
 10616  10617 -10618  1096 -10621 0

c  0-1 --> -1
c    (-b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧ -p_1096) -> ( b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0)
c  in CNF:
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨  b^{8, 138}_2
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_1
c     b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨  b^{8, 138}_0
c  in DIMACS:
 10616  10617  10618  1096  10619 0
 10616  10617  10618  1096 -10620 0
 10616  10617  10618  1096  10621 0

c  -1-1 --> -2
c    ( b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧  b^{8, 137}_0 ∧ -p_1096) -> ( b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0)
c  in CNF:
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨  b^{8, 138}_2
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨  b^{8, 138}_1
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨  p_1096 ∨ -b^{8, 138}_0
c  in DIMACS:
-10616  10617 -10618  1096  10619 0
-10616  10617 -10618  1096  10620 0
-10616  10617 -10618  1096 -10621 0

c  -2-1 --> break 
c    ( b^{8, 137}_2 ∧  b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨  b^{8, 137}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-10616 -10617  10618  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 137}_2 ∧ -b^{8, 137}_1 ∧ -b^{8, 137}_0 ∧ true) 
c  in CNF:
c    -b^{8, 137}_2 ∨  b^{8, 137}_1 ∨  b^{8, 137}_0 ∨ false 
c  in DIMACS:
-10616  10617  10618  0

c  3 does not represent an automaton state.
c    -(-b^{8, 137}_2 ∧  b^{8, 137}_1 ∧  b^{8, 137}_0 ∧ true) 
c  in CNF:
c     b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ false 
c  in DIMACS:
 10616 -10617 -10618  0
c  -3 does not represent an automaton state.
c    -( b^{8, 137}_2 ∧  b^{8, 137}_1 ∧  b^{8, 137}_0 ∧ true) 
c  in CNF:
c    -b^{8, 137}_2 ∨ -b^{8, 137}_1 ∨ -b^{8, 137}_0 ∨ false 
c  in DIMACS:
-10616 -10617 -10618  0

c i = 138
c  -2+1 --> -1
c    ( b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧  p_1104) -> ( b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0)
c  in CNF:
c    -b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨  b^{8, 139}_2
c    -b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_1
c    -b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨  b^{8, 139}_0
c  in DIMACS:
-10619 -10620  10621 -1104  10622 0
-10619 -10620  10621 -1104 -10623 0
-10619 -10620  10621 -1104  10624 0

c  -1+1 --> 0
c    ( b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0 ∧  p_1104) -> (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧ -b^{8, 139}_0)
c  in CNF:
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_2
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_1
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_0
c  in DIMACS:
-10619  10620 -10621 -1104 -10622 0
-10619  10620 -10621 -1104 -10623 0
-10619  10620 -10621 -1104 -10624 0

c  0+1 --> 1
c    (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧  p_1104) -> (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0)
c  in CNF:
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_2
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_1
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨  b^{8, 139}_0
c  in DIMACS:
 10619  10620  10621 -1104 -10622 0
 10619  10620  10621 -1104 -10623 0
 10619  10620  10621 -1104  10624 0

c  1+1 --> 2
c    (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0 ∧  p_1104) -> (-b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0)
c  in CNF:
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_2
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨  b^{8, 139}_1
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ -p_1104 ∨ -b^{8, 139}_0
c  in DIMACS:
 10619  10620 -10621 -1104 -10622 0
 10619  10620 -10621 -1104  10623 0
 10619  10620 -10621 -1104 -10624 0

c  2+1 --> break 
c    (-b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 10619 -10620  10621 -1104 1162 0


c  2-1 --> 1
c    (-b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧ -p_1104) -> (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0)
c  in CNF:
c     b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_2
c     b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_1
c     b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨  b^{8, 139}_0
c  in DIMACS:
 10619 -10620  10621  1104 -10622 0
 10619 -10620  10621  1104 -10623 0
 10619 -10620  10621  1104  10624 0

c  1-1 --> 0
c    (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0 ∧ -p_1104) -> (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧ -b^{8, 139}_0)
c  in CNF:
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_2
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_1
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_0
c  in DIMACS:
 10619  10620 -10621  1104 -10622 0
 10619  10620 -10621  1104 -10623 0
 10619  10620 -10621  1104 -10624 0

c  0-1 --> -1
c    (-b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧ -p_1104) -> ( b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0)
c  in CNF:
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨  b^{8, 139}_2
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_1
c     b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨  b^{8, 139}_0
c  in DIMACS:
 10619  10620  10621  1104  10622 0
 10619  10620  10621  1104 -10623 0
 10619  10620  10621  1104  10624 0

c  -1-1 --> -2
c    ( b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧  b^{8, 138}_0 ∧ -p_1104) -> ( b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0)
c  in CNF:
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨  b^{8, 139}_2
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨  b^{8, 139}_1
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨  p_1104 ∨ -b^{8, 139}_0
c  in DIMACS:
-10619  10620 -10621  1104  10622 0
-10619  10620 -10621  1104  10623 0
-10619  10620 -10621  1104 -10624 0

c  -2-1 --> break 
c    ( b^{8, 138}_2 ∧  b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨  b^{8, 138}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-10619 -10620  10621  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 138}_2 ∧ -b^{8, 138}_1 ∧ -b^{8, 138}_0 ∧ true) 
c  in CNF:
c    -b^{8, 138}_2 ∨  b^{8, 138}_1 ∨  b^{8, 138}_0 ∨ false 
c  in DIMACS:
-10619  10620  10621  0

c  3 does not represent an automaton state.
c    -(-b^{8, 138}_2 ∧  b^{8, 138}_1 ∧  b^{8, 138}_0 ∧ true) 
c  in CNF:
c     b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ false 
c  in DIMACS:
 10619 -10620 -10621  0
c  -3 does not represent an automaton state.
c    -( b^{8, 138}_2 ∧  b^{8, 138}_1 ∧  b^{8, 138}_0 ∧ true) 
c  in CNF:
c    -b^{8, 138}_2 ∨ -b^{8, 138}_1 ∨ -b^{8, 138}_0 ∨ false 
c  in DIMACS:
-10619 -10620 -10621  0

c i = 139
c  -2+1 --> -1
c    ( b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧  p_1112) -> ( b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0)
c  in CNF:
c    -b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨  b^{8, 140}_2
c    -b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_1
c    -b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨  b^{8, 140}_0
c  in DIMACS:
-10622 -10623  10624 -1112  10625 0
-10622 -10623  10624 -1112 -10626 0
-10622 -10623  10624 -1112  10627 0

c  -1+1 --> 0
c    ( b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0 ∧  p_1112) -> (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧ -b^{8, 140}_0)
c  in CNF:
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_2
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_1
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_0
c  in DIMACS:
-10622  10623 -10624 -1112 -10625 0
-10622  10623 -10624 -1112 -10626 0
-10622  10623 -10624 -1112 -10627 0

c  0+1 --> 1
c    (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧  p_1112) -> (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0)
c  in CNF:
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_2
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_1
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨  b^{8, 140}_0
c  in DIMACS:
 10622  10623  10624 -1112 -10625 0
 10622  10623  10624 -1112 -10626 0
 10622  10623  10624 -1112  10627 0

c  1+1 --> 2
c    (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0 ∧  p_1112) -> (-b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0)
c  in CNF:
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_2
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨  b^{8, 140}_1
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ -p_1112 ∨ -b^{8, 140}_0
c  in DIMACS:
 10622  10623 -10624 -1112 -10625 0
 10622  10623 -10624 -1112  10626 0
 10622  10623 -10624 -1112 -10627 0

c  2+1 --> break 
c    (-b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 10622 -10623  10624 -1112 1162 0


c  2-1 --> 1
c    (-b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧ -p_1112) -> (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0)
c  in CNF:
c     b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_2
c     b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_1
c     b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨  b^{8, 140}_0
c  in DIMACS:
 10622 -10623  10624  1112 -10625 0
 10622 -10623  10624  1112 -10626 0
 10622 -10623  10624  1112  10627 0

c  1-1 --> 0
c    (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0 ∧ -p_1112) -> (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧ -b^{8, 140}_0)
c  in CNF:
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_2
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_1
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_0
c  in DIMACS:
 10622  10623 -10624  1112 -10625 0
 10622  10623 -10624  1112 -10626 0
 10622  10623 -10624  1112 -10627 0

c  0-1 --> -1
c    (-b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧ -p_1112) -> ( b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0)
c  in CNF:
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨  b^{8, 140}_2
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_1
c     b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨  b^{8, 140}_0
c  in DIMACS:
 10622  10623  10624  1112  10625 0
 10622  10623  10624  1112 -10626 0
 10622  10623  10624  1112  10627 0

c  -1-1 --> -2
c    ( b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧  b^{8, 139}_0 ∧ -p_1112) -> ( b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0)
c  in CNF:
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨  b^{8, 140}_2
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨  b^{8, 140}_1
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨  p_1112 ∨ -b^{8, 140}_0
c  in DIMACS:
-10622  10623 -10624  1112  10625 0
-10622  10623 -10624  1112  10626 0
-10622  10623 -10624  1112 -10627 0

c  -2-1 --> break 
c    ( b^{8, 139}_2 ∧  b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨  b^{8, 139}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-10622 -10623  10624  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 139}_2 ∧ -b^{8, 139}_1 ∧ -b^{8, 139}_0 ∧ true) 
c  in CNF:
c    -b^{8, 139}_2 ∨  b^{8, 139}_1 ∨  b^{8, 139}_0 ∨ false 
c  in DIMACS:
-10622  10623  10624  0

c  3 does not represent an automaton state.
c    -(-b^{8, 139}_2 ∧  b^{8, 139}_1 ∧  b^{8, 139}_0 ∧ true) 
c  in CNF:
c     b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ false 
c  in DIMACS:
 10622 -10623 -10624  0
c  -3 does not represent an automaton state.
c    -( b^{8, 139}_2 ∧  b^{8, 139}_1 ∧  b^{8, 139}_0 ∧ true) 
c  in CNF:
c    -b^{8, 139}_2 ∨ -b^{8, 139}_1 ∨ -b^{8, 139}_0 ∨ false 
c  in DIMACS:
-10622 -10623 -10624  0

c i = 140
c  -2+1 --> -1
c    ( b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧  p_1120) -> ( b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0)
c  in CNF:
c    -b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨  b^{8, 141}_2
c    -b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_1
c    -b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨  b^{8, 141}_0
c  in DIMACS:
-10625 -10626  10627 -1120  10628 0
-10625 -10626  10627 -1120 -10629 0
-10625 -10626  10627 -1120  10630 0

c  -1+1 --> 0
c    ( b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0 ∧  p_1120) -> (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧ -b^{8, 141}_0)
c  in CNF:
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_2
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_1
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_0
c  in DIMACS:
-10625  10626 -10627 -1120 -10628 0
-10625  10626 -10627 -1120 -10629 0
-10625  10626 -10627 -1120 -10630 0

c  0+1 --> 1
c    (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧  p_1120) -> (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0)
c  in CNF:
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_2
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_1
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨  b^{8, 141}_0
c  in DIMACS:
 10625  10626  10627 -1120 -10628 0
 10625  10626  10627 -1120 -10629 0
 10625  10626  10627 -1120  10630 0

c  1+1 --> 2
c    (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0 ∧  p_1120) -> (-b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0)
c  in CNF:
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_2
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨  b^{8, 141}_1
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ -p_1120 ∨ -b^{8, 141}_0
c  in DIMACS:
 10625  10626 -10627 -1120 -10628 0
 10625  10626 -10627 -1120  10629 0
 10625  10626 -10627 -1120 -10630 0

c  2+1 --> break 
c    (-b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 10625 -10626  10627 -1120 1162 0


c  2-1 --> 1
c    (-b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧ -p_1120) -> (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0)
c  in CNF:
c     b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_2
c     b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_1
c     b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨  b^{8, 141}_0
c  in DIMACS:
 10625 -10626  10627  1120 -10628 0
 10625 -10626  10627  1120 -10629 0
 10625 -10626  10627  1120  10630 0

c  1-1 --> 0
c    (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0 ∧ -p_1120) -> (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧ -b^{8, 141}_0)
c  in CNF:
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_2
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_1
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_0
c  in DIMACS:
 10625  10626 -10627  1120 -10628 0
 10625  10626 -10627  1120 -10629 0
 10625  10626 -10627  1120 -10630 0

c  0-1 --> -1
c    (-b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧ -p_1120) -> ( b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0)
c  in CNF:
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨  b^{8, 141}_2
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_1
c     b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨  b^{8, 141}_0
c  in DIMACS:
 10625  10626  10627  1120  10628 0
 10625  10626  10627  1120 -10629 0
 10625  10626  10627  1120  10630 0

c  -1-1 --> -2
c    ( b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧  b^{8, 140}_0 ∧ -p_1120) -> ( b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0)
c  in CNF:
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨  b^{8, 141}_2
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨  b^{8, 141}_1
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨  p_1120 ∨ -b^{8, 141}_0
c  in DIMACS:
-10625  10626 -10627  1120  10628 0
-10625  10626 -10627  1120  10629 0
-10625  10626 -10627  1120 -10630 0

c  -2-1 --> break 
c    ( b^{8, 140}_2 ∧  b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨  b^{8, 140}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-10625 -10626  10627  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 140}_2 ∧ -b^{8, 140}_1 ∧ -b^{8, 140}_0 ∧ true) 
c  in CNF:
c    -b^{8, 140}_2 ∨  b^{8, 140}_1 ∨  b^{8, 140}_0 ∨ false 
c  in DIMACS:
-10625  10626  10627  0

c  3 does not represent an automaton state.
c    -(-b^{8, 140}_2 ∧  b^{8, 140}_1 ∧  b^{8, 140}_0 ∧ true) 
c  in CNF:
c     b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ false 
c  in DIMACS:
 10625 -10626 -10627  0
c  -3 does not represent an automaton state.
c    -( b^{8, 140}_2 ∧  b^{8, 140}_1 ∧  b^{8, 140}_0 ∧ true) 
c  in CNF:
c    -b^{8, 140}_2 ∨ -b^{8, 140}_1 ∨ -b^{8, 140}_0 ∨ false 
c  in DIMACS:
-10625 -10626 -10627  0

c i = 141
c  -2+1 --> -1
c    ( b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧  p_1128) -> ( b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0)
c  in CNF:
c    -b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨  b^{8, 142}_2
c    -b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_1
c    -b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨  b^{8, 142}_0
c  in DIMACS:
-10628 -10629  10630 -1128  10631 0
-10628 -10629  10630 -1128 -10632 0
-10628 -10629  10630 -1128  10633 0

c  -1+1 --> 0
c    ( b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0 ∧  p_1128) -> (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧ -b^{8, 142}_0)
c  in CNF:
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_2
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_1
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_0
c  in DIMACS:
-10628  10629 -10630 -1128 -10631 0
-10628  10629 -10630 -1128 -10632 0
-10628  10629 -10630 -1128 -10633 0

c  0+1 --> 1
c    (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧  p_1128) -> (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0)
c  in CNF:
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_2
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_1
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨  b^{8, 142}_0
c  in DIMACS:
 10628  10629  10630 -1128 -10631 0
 10628  10629  10630 -1128 -10632 0
 10628  10629  10630 -1128  10633 0

c  1+1 --> 2
c    (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0 ∧  p_1128) -> (-b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0)
c  in CNF:
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_2
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨  b^{8, 142}_1
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ -p_1128 ∨ -b^{8, 142}_0
c  in DIMACS:
 10628  10629 -10630 -1128 -10631 0
 10628  10629 -10630 -1128  10632 0
 10628  10629 -10630 -1128 -10633 0

c  2+1 --> break 
c    (-b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 10628 -10629  10630 -1128 1162 0


c  2-1 --> 1
c    (-b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧ -p_1128) -> (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0)
c  in CNF:
c     b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_2
c     b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_1
c     b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨  b^{8, 142}_0
c  in DIMACS:
 10628 -10629  10630  1128 -10631 0
 10628 -10629  10630  1128 -10632 0
 10628 -10629  10630  1128  10633 0

c  1-1 --> 0
c    (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0 ∧ -p_1128) -> (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧ -b^{8, 142}_0)
c  in CNF:
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_2
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_1
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_0
c  in DIMACS:
 10628  10629 -10630  1128 -10631 0
 10628  10629 -10630  1128 -10632 0
 10628  10629 -10630  1128 -10633 0

c  0-1 --> -1
c    (-b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧ -p_1128) -> ( b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0)
c  in CNF:
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨  b^{8, 142}_2
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_1
c     b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨  b^{8, 142}_0
c  in DIMACS:
 10628  10629  10630  1128  10631 0
 10628  10629  10630  1128 -10632 0
 10628  10629  10630  1128  10633 0

c  -1-1 --> -2
c    ( b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧  b^{8, 141}_0 ∧ -p_1128) -> ( b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0)
c  in CNF:
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨  b^{8, 142}_2
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨  b^{8, 142}_1
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨  p_1128 ∨ -b^{8, 142}_0
c  in DIMACS:
-10628  10629 -10630  1128  10631 0
-10628  10629 -10630  1128  10632 0
-10628  10629 -10630  1128 -10633 0

c  -2-1 --> break 
c    ( b^{8, 141}_2 ∧  b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨  b^{8, 141}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-10628 -10629  10630  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 141}_2 ∧ -b^{8, 141}_1 ∧ -b^{8, 141}_0 ∧ true) 
c  in CNF:
c    -b^{8, 141}_2 ∨  b^{8, 141}_1 ∨  b^{8, 141}_0 ∨ false 
c  in DIMACS:
-10628  10629  10630  0

c  3 does not represent an automaton state.
c    -(-b^{8, 141}_2 ∧  b^{8, 141}_1 ∧  b^{8, 141}_0 ∧ true) 
c  in CNF:
c     b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ false 
c  in DIMACS:
 10628 -10629 -10630  0
c  -3 does not represent an automaton state.
c    -( b^{8, 141}_2 ∧  b^{8, 141}_1 ∧  b^{8, 141}_0 ∧ true) 
c  in CNF:
c    -b^{8, 141}_2 ∨ -b^{8, 141}_1 ∨ -b^{8, 141}_0 ∨ false 
c  in DIMACS:
-10628 -10629 -10630  0

c i = 142
c  -2+1 --> -1
c    ( b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧  p_1136) -> ( b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0)
c  in CNF:
c    -b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨  b^{8, 143}_2
c    -b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_1
c    -b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨  b^{8, 143}_0
c  in DIMACS:
-10631 -10632  10633 -1136  10634 0
-10631 -10632  10633 -1136 -10635 0
-10631 -10632  10633 -1136  10636 0

c  -1+1 --> 0
c    ( b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0 ∧  p_1136) -> (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧ -b^{8, 143}_0)
c  in CNF:
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_2
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_1
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_0
c  in DIMACS:
-10631  10632 -10633 -1136 -10634 0
-10631  10632 -10633 -1136 -10635 0
-10631  10632 -10633 -1136 -10636 0

c  0+1 --> 1
c    (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧  p_1136) -> (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0)
c  in CNF:
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_2
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_1
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨  b^{8, 143}_0
c  in DIMACS:
 10631  10632  10633 -1136 -10634 0
 10631  10632  10633 -1136 -10635 0
 10631  10632  10633 -1136  10636 0

c  1+1 --> 2
c    (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0 ∧  p_1136) -> (-b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0)
c  in CNF:
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_2
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨  b^{8, 143}_1
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ -p_1136 ∨ -b^{8, 143}_0
c  in DIMACS:
 10631  10632 -10633 -1136 -10634 0
 10631  10632 -10633 -1136  10635 0
 10631  10632 -10633 -1136 -10636 0

c  2+1 --> break 
c    (-b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 10631 -10632  10633 -1136 1162 0


c  2-1 --> 1
c    (-b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧ -p_1136) -> (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0)
c  in CNF:
c     b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_2
c     b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_1
c     b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨  b^{8, 143}_0
c  in DIMACS:
 10631 -10632  10633  1136 -10634 0
 10631 -10632  10633  1136 -10635 0
 10631 -10632  10633  1136  10636 0

c  1-1 --> 0
c    (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0 ∧ -p_1136) -> (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧ -b^{8, 143}_0)
c  in CNF:
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_2
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_1
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_0
c  in DIMACS:
 10631  10632 -10633  1136 -10634 0
 10631  10632 -10633  1136 -10635 0
 10631  10632 -10633  1136 -10636 0

c  0-1 --> -1
c    (-b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧ -p_1136) -> ( b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0)
c  in CNF:
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨  b^{8, 143}_2
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_1
c     b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨  b^{8, 143}_0
c  in DIMACS:
 10631  10632  10633  1136  10634 0
 10631  10632  10633  1136 -10635 0
 10631  10632  10633  1136  10636 0

c  -1-1 --> -2
c    ( b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧  b^{8, 142}_0 ∧ -p_1136) -> ( b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0)
c  in CNF:
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨  b^{8, 143}_2
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨  b^{8, 143}_1
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨  p_1136 ∨ -b^{8, 143}_0
c  in DIMACS:
-10631  10632 -10633  1136  10634 0
-10631  10632 -10633  1136  10635 0
-10631  10632 -10633  1136 -10636 0

c  -2-1 --> break 
c    ( b^{8, 142}_2 ∧  b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨  b^{8, 142}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-10631 -10632  10633  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 142}_2 ∧ -b^{8, 142}_1 ∧ -b^{8, 142}_0 ∧ true) 
c  in CNF:
c    -b^{8, 142}_2 ∨  b^{8, 142}_1 ∨  b^{8, 142}_0 ∨ false 
c  in DIMACS:
-10631  10632  10633  0

c  3 does not represent an automaton state.
c    -(-b^{8, 142}_2 ∧  b^{8, 142}_1 ∧  b^{8, 142}_0 ∧ true) 
c  in CNF:
c     b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ false 
c  in DIMACS:
 10631 -10632 -10633  0
c  -3 does not represent an automaton state.
c    -( b^{8, 142}_2 ∧  b^{8, 142}_1 ∧  b^{8, 142}_0 ∧ true) 
c  in CNF:
c    -b^{8, 142}_2 ∨ -b^{8, 142}_1 ∨ -b^{8, 142}_0 ∨ false 
c  in DIMACS:
-10631 -10632 -10633  0

c i = 143
c  -2+1 --> -1
c    ( b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧  p_1144) -> ( b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0)
c  in CNF:
c    -b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨  b^{8, 144}_2
c    -b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_1
c    -b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨  b^{8, 144}_0
c  in DIMACS:
-10634 -10635  10636 -1144  10637 0
-10634 -10635  10636 -1144 -10638 0
-10634 -10635  10636 -1144  10639 0

c  -1+1 --> 0
c    ( b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0 ∧  p_1144) -> (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧ -b^{8, 144}_0)
c  in CNF:
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_2
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_1
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_0
c  in DIMACS:
-10634  10635 -10636 -1144 -10637 0
-10634  10635 -10636 -1144 -10638 0
-10634  10635 -10636 -1144 -10639 0

c  0+1 --> 1
c    (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧  p_1144) -> (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0)
c  in CNF:
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_2
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_1
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨  b^{8, 144}_0
c  in DIMACS:
 10634  10635  10636 -1144 -10637 0
 10634  10635  10636 -1144 -10638 0
 10634  10635  10636 -1144  10639 0

c  1+1 --> 2
c    (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0 ∧  p_1144) -> (-b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0)
c  in CNF:
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_2
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨  b^{8, 144}_1
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ -p_1144 ∨ -b^{8, 144}_0
c  in DIMACS:
 10634  10635 -10636 -1144 -10637 0
 10634  10635 -10636 -1144  10638 0
 10634  10635 -10636 -1144 -10639 0

c  2+1 --> break 
c    (-b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 10634 -10635  10636 -1144 1162 0


c  2-1 --> 1
c    (-b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧ -p_1144) -> (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0)
c  in CNF:
c     b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_2
c     b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_1
c     b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨  b^{8, 144}_0
c  in DIMACS:
 10634 -10635  10636  1144 -10637 0
 10634 -10635  10636  1144 -10638 0
 10634 -10635  10636  1144  10639 0

c  1-1 --> 0
c    (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0 ∧ -p_1144) -> (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧ -b^{8, 144}_0)
c  in CNF:
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_2
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_1
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_0
c  in DIMACS:
 10634  10635 -10636  1144 -10637 0
 10634  10635 -10636  1144 -10638 0
 10634  10635 -10636  1144 -10639 0

c  0-1 --> -1
c    (-b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧ -p_1144) -> ( b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0)
c  in CNF:
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨  b^{8, 144}_2
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_1
c     b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨  b^{8, 144}_0
c  in DIMACS:
 10634  10635  10636  1144  10637 0
 10634  10635  10636  1144 -10638 0
 10634  10635  10636  1144  10639 0

c  -1-1 --> -2
c    ( b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧  b^{8, 143}_0 ∧ -p_1144) -> ( b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0)
c  in CNF:
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨  b^{8, 144}_2
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨  b^{8, 144}_1
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨  p_1144 ∨ -b^{8, 144}_0
c  in DIMACS:
-10634  10635 -10636  1144  10637 0
-10634  10635 -10636  1144  10638 0
-10634  10635 -10636  1144 -10639 0

c  -2-1 --> break 
c    ( b^{8, 143}_2 ∧  b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨  b^{8, 143}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-10634 -10635  10636  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 143}_2 ∧ -b^{8, 143}_1 ∧ -b^{8, 143}_0 ∧ true) 
c  in CNF:
c    -b^{8, 143}_2 ∨  b^{8, 143}_1 ∨  b^{8, 143}_0 ∨ false 
c  in DIMACS:
-10634  10635  10636  0

c  3 does not represent an automaton state.
c    -(-b^{8, 143}_2 ∧  b^{8, 143}_1 ∧  b^{8, 143}_0 ∧ true) 
c  in CNF:
c     b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ false 
c  in DIMACS:
 10634 -10635 -10636  0
c  -3 does not represent an automaton state.
c    -( b^{8, 143}_2 ∧  b^{8, 143}_1 ∧  b^{8, 143}_0 ∧ true) 
c  in CNF:
c    -b^{8, 143}_2 ∨ -b^{8, 143}_1 ∨ -b^{8, 143}_0 ∨ false 
c  in DIMACS:
-10634 -10635 -10636  0

c i = 144
c  -2+1 --> -1
c    ( b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧  p_1152) -> ( b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0)
c  in CNF:
c    -b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨  b^{8, 145}_2
c    -b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_1
c    -b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨  b^{8, 145}_0
c  in DIMACS:
-10637 -10638  10639 -1152  10640 0
-10637 -10638  10639 -1152 -10641 0
-10637 -10638  10639 -1152  10642 0

c  -1+1 --> 0
c    ( b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0 ∧  p_1152) -> (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧ -b^{8, 145}_0)
c  in CNF:
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_2
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_1
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_0
c  in DIMACS:
-10637  10638 -10639 -1152 -10640 0
-10637  10638 -10639 -1152 -10641 0
-10637  10638 -10639 -1152 -10642 0

c  0+1 --> 1
c    (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧  p_1152) -> (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0)
c  in CNF:
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_2
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_1
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨  b^{8, 145}_0
c  in DIMACS:
 10637  10638  10639 -1152 -10640 0
 10637  10638  10639 -1152 -10641 0
 10637  10638  10639 -1152  10642 0

c  1+1 --> 2
c    (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0 ∧  p_1152) -> (-b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0)
c  in CNF:
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_2
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨  b^{8, 145}_1
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ -p_1152 ∨ -b^{8, 145}_0
c  in DIMACS:
 10637  10638 -10639 -1152 -10640 0
 10637  10638 -10639 -1152  10641 0
 10637  10638 -10639 -1152 -10642 0

c  2+1 --> break 
c    (-b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 10637 -10638  10639 -1152 1162 0


c  2-1 --> 1
c    (-b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧ -p_1152) -> (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0)
c  in CNF:
c     b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_2
c     b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_1
c     b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨  b^{8, 145}_0
c  in DIMACS:
 10637 -10638  10639  1152 -10640 0
 10637 -10638  10639  1152 -10641 0
 10637 -10638  10639  1152  10642 0

c  1-1 --> 0
c    (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0 ∧ -p_1152) -> (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧ -b^{8, 145}_0)
c  in CNF:
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_2
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_1
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_0
c  in DIMACS:
 10637  10638 -10639  1152 -10640 0
 10637  10638 -10639  1152 -10641 0
 10637  10638 -10639  1152 -10642 0

c  0-1 --> -1
c    (-b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧ -p_1152) -> ( b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0)
c  in CNF:
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨  b^{8, 145}_2
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_1
c     b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨  b^{8, 145}_0
c  in DIMACS:
 10637  10638  10639  1152  10640 0
 10637  10638  10639  1152 -10641 0
 10637  10638  10639  1152  10642 0

c  -1-1 --> -2
c    ( b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧  b^{8, 144}_0 ∧ -p_1152) -> ( b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0)
c  in CNF:
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨  b^{8, 145}_2
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨  b^{8, 145}_1
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨  p_1152 ∨ -b^{8, 145}_0
c  in DIMACS:
-10637  10638 -10639  1152  10640 0
-10637  10638 -10639  1152  10641 0
-10637  10638 -10639  1152 -10642 0

c  -2-1 --> break 
c    ( b^{8, 144}_2 ∧  b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨  b^{8, 144}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-10637 -10638  10639  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 144}_2 ∧ -b^{8, 144}_1 ∧ -b^{8, 144}_0 ∧ true) 
c  in CNF:
c    -b^{8, 144}_2 ∨  b^{8, 144}_1 ∨  b^{8, 144}_0 ∨ false 
c  in DIMACS:
-10637  10638  10639  0

c  3 does not represent an automaton state.
c    -(-b^{8, 144}_2 ∧  b^{8, 144}_1 ∧  b^{8, 144}_0 ∧ true) 
c  in CNF:
c     b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ false 
c  in DIMACS:
 10637 -10638 -10639  0
c  -3 does not represent an automaton state.
c    -( b^{8, 144}_2 ∧  b^{8, 144}_1 ∧  b^{8, 144}_0 ∧ true) 
c  in CNF:
c    -b^{8, 144}_2 ∨ -b^{8, 144}_1 ∨ -b^{8, 144}_0 ∨ false 
c  in DIMACS:
-10637 -10638 -10639  0

c i = 145
c  -2+1 --> -1
c    ( b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧  p_1160) -> ( b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧  b^{8, 146}_0)
c  in CNF:
c    -b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨  b^{8, 146}_2
c    -b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_1
c    -b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨  b^{8, 146}_0
c  in DIMACS:
-10640 -10641  10642 -1160  10643 0
-10640 -10641  10642 -1160 -10644 0
-10640 -10641  10642 -1160  10645 0

c  -1+1 --> 0
c    ( b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0 ∧  p_1160) -> (-b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧ -b^{8, 146}_0)
c  in CNF:
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_2
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_1
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_0
c  in DIMACS:
-10640  10641 -10642 -1160 -10643 0
-10640  10641 -10642 -1160 -10644 0
-10640  10641 -10642 -1160 -10645 0

c  0+1 --> 1
c    (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧  p_1160) -> (-b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧  b^{8, 146}_0)
c  in CNF:
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_2
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_1
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨  b^{8, 146}_0
c  in DIMACS:
 10640  10641  10642 -1160 -10643 0
 10640  10641  10642 -1160 -10644 0
 10640  10641  10642 -1160  10645 0

c  1+1 --> 2
c    (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0 ∧  p_1160) -> (-b^{8, 146}_2 ∧  b^{8, 146}_1 ∧ -b^{8, 146}_0)
c  in CNF:
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_2
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨  b^{8, 146}_1
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ -p_1160 ∨ -b^{8, 146}_0
c  in DIMACS:
 10640  10641 -10642 -1160 -10643 0
 10640  10641 -10642 -1160  10644 0
 10640  10641 -10642 -1160 -10645 0

c  2+1 --> break 
c    (-b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 10640 -10641  10642 -1160 1162 0


c  2-1 --> 1
c    (-b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧ -p_1160) -> (-b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧  b^{8, 146}_0)
c  in CNF:
c     b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_2
c     b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_1
c     b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨  b^{8, 146}_0
c  in DIMACS:
 10640 -10641  10642  1160 -10643 0
 10640 -10641  10642  1160 -10644 0
 10640 -10641  10642  1160  10645 0

c  1-1 --> 0
c    (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0 ∧ -p_1160) -> (-b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧ -b^{8, 146}_0)
c  in CNF:
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_2
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_1
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_0
c  in DIMACS:
 10640  10641 -10642  1160 -10643 0
 10640  10641 -10642  1160 -10644 0
 10640  10641 -10642  1160 -10645 0

c  0-1 --> -1
c    (-b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧ -p_1160) -> ( b^{8, 146}_2 ∧ -b^{8, 146}_1 ∧  b^{8, 146}_0)
c  in CNF:
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨  b^{8, 146}_2
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_1
c     b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨  b^{8, 146}_0
c  in DIMACS:
 10640  10641  10642  1160  10643 0
 10640  10641  10642  1160 -10644 0
 10640  10641  10642  1160  10645 0

c  -1-1 --> -2
c    ( b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧  b^{8, 145}_0 ∧ -p_1160) -> ( b^{8, 146}_2 ∧  b^{8, 146}_1 ∧ -b^{8, 146}_0)
c  in CNF:
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨  b^{8, 146}_2
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨  b^{8, 146}_1
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨  p_1160 ∨ -b^{8, 146}_0
c  in DIMACS:
-10640  10641 -10642  1160  10643 0
-10640  10641 -10642  1160  10644 0
-10640  10641 -10642  1160 -10645 0

c  -2-1 --> break 
c    ( b^{8, 145}_2 ∧  b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨  b^{8, 145}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-10640 -10641  10642  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{8, 145}_2 ∧ -b^{8, 145}_1 ∧ -b^{8, 145}_0 ∧ true) 
c  in CNF:
c    -b^{8, 145}_2 ∨  b^{8, 145}_1 ∨  b^{8, 145}_0 ∨ false 
c  in DIMACS:
-10640  10641  10642  0

c  3 does not represent an automaton state.
c    -(-b^{8, 145}_2 ∧  b^{8, 145}_1 ∧  b^{8, 145}_0 ∧ true) 
c  in CNF:
c     b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ false 
c  in DIMACS:
 10640 -10641 -10642  0
c  -3 does not represent an automaton state.
c    -( b^{8, 145}_2 ∧  b^{8, 145}_1 ∧  b^{8, 145}_0 ∧ true) 
c  in CNF:
c    -b^{8, 145}_2 ∨ -b^{8, 145}_1 ∨ -b^{8, 145}_0 ∨ false 
c  in DIMACS:
-10640 -10641 -10642  0

c INIT for k = 9
c    -b^{9, 1}_2
c    -b^{9, 1}_1
c    -b^{9, 1}_0
c  in DIMACS:
-10646 0
-10647 0
-10648 0

c Transitions for k = 9
c i = 1
c  -2+1 --> -1
c    ( b^{9, 1}_2 ∧  b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧  p_9) -> ( b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0)
c  in CNF:
c    -b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨  b^{9, 2}_2
c    -b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_1
c    -b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨  b^{9, 2}_0
c  in DIMACS:
-10646 -10647  10648 -9  10649 0
-10646 -10647  10648 -9 -10650 0
-10646 -10647  10648 -9  10651 0

c  -1+1 --> 0
c    ( b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧  b^{9, 1}_0 ∧  p_9) -> (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧ -b^{9, 2}_0)
c  in CNF:
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_2
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_1
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_0
c  in DIMACS:
-10646  10647 -10648 -9 -10649 0
-10646  10647 -10648 -9 -10650 0
-10646  10647 -10648 -9 -10651 0

c  0+1 --> 1
c    (-b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧  p_9) -> (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0)
c  in CNF:
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_2
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_1
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨  b^{9, 2}_0
c  in DIMACS:
 10646  10647  10648 -9 -10649 0
 10646  10647  10648 -9 -10650 0
 10646  10647  10648 -9  10651 0

c  1+1 --> 2
c    (-b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧  b^{9, 1}_0 ∧  p_9) -> (-b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0)
c  in CNF:
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_2
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨  b^{9, 2}_1
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ -p_9 ∨ -b^{9, 2}_0
c  in DIMACS:
 10646  10647 -10648 -9 -10649 0
 10646  10647 -10648 -9  10650 0
 10646  10647 -10648 -9 -10651 0

c  2+1 --> break 
c    (-b^{9, 1}_2 ∧  b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧  p_9) -> break
c  in CNF:
c     b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ -p_9 ∨ break
c  in DIMACS:
 10646 -10647  10648 -9 1162 0


c  2-1 --> 1
c    (-b^{9, 1}_2 ∧  b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧ -p_9) -> (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0)
c  in CNF:
c     b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_2
c     b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_1
c     b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨  b^{9, 2}_0
c  in DIMACS:
 10646 -10647  10648  9 -10649 0
 10646 -10647  10648  9 -10650 0
 10646 -10647  10648  9  10651 0

c  1-1 --> 0
c    (-b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧  b^{9, 1}_0 ∧ -p_9) -> (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧ -b^{9, 2}_0)
c  in CNF:
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_2
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_1
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_0
c  in DIMACS:
 10646  10647 -10648  9 -10649 0
 10646  10647 -10648  9 -10650 0
 10646  10647 -10648  9 -10651 0

c  0-1 --> -1
c    (-b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧ -p_9) -> ( b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0)
c  in CNF:
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨  b^{9, 2}_2
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_1
c     b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨  b^{9, 2}_0
c  in DIMACS:
 10646  10647  10648  9  10649 0
 10646  10647  10648  9 -10650 0
 10646  10647  10648  9  10651 0

c  -1-1 --> -2
c    ( b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧  b^{9, 1}_0 ∧ -p_9) -> ( b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0)
c  in CNF:
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨  b^{9, 2}_2
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨  b^{9, 2}_1
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨  p_9 ∨ -b^{9, 2}_0
c  in DIMACS:
-10646  10647 -10648  9  10649 0
-10646  10647 -10648  9  10650 0
-10646  10647 -10648  9 -10651 0

c  -2-1 --> break 
c    ( b^{9, 1}_2 ∧  b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧ -p_9) -> break
c  in CNF:
c    -b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨  b^{9, 1}_0 ∨  p_9 ∨ break
c  in DIMACS:
-10646 -10647  10648  9 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 1}_2 ∧ -b^{9, 1}_1 ∧ -b^{9, 1}_0 ∧ true) 
c  in CNF:
c    -b^{9, 1}_2 ∨  b^{9, 1}_1 ∨  b^{9, 1}_0 ∨ false 
c  in DIMACS:
-10646  10647  10648  0

c  3 does not represent an automaton state.
c    -(-b^{9, 1}_2 ∧  b^{9, 1}_1 ∧  b^{9, 1}_0 ∧ true) 
c  in CNF:
c     b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ false 
c  in DIMACS:
 10646 -10647 -10648  0
c  -3 does not represent an automaton state.
c    -( b^{9, 1}_2 ∧  b^{9, 1}_1 ∧  b^{9, 1}_0 ∧ true) 
c  in CNF:
c    -b^{9, 1}_2 ∨ -b^{9, 1}_1 ∨ -b^{9, 1}_0 ∨ false 
c  in DIMACS:
-10646 -10647 -10648  0

c i = 2
c  -2+1 --> -1
c    ( b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧  p_18) -> ( b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0)
c  in CNF:
c    -b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨  b^{9, 3}_2
c    -b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_1
c    -b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨  b^{9, 3}_0
c  in DIMACS:
-10649 -10650  10651 -18  10652 0
-10649 -10650  10651 -18 -10653 0
-10649 -10650  10651 -18  10654 0

c  -1+1 --> 0
c    ( b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0 ∧  p_18) -> (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧ -b^{9, 3}_0)
c  in CNF:
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_2
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_1
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_0
c  in DIMACS:
-10649  10650 -10651 -18 -10652 0
-10649  10650 -10651 -18 -10653 0
-10649  10650 -10651 -18 -10654 0

c  0+1 --> 1
c    (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧  p_18) -> (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0)
c  in CNF:
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_2
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_1
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨  b^{9, 3}_0
c  in DIMACS:
 10649  10650  10651 -18 -10652 0
 10649  10650  10651 -18 -10653 0
 10649  10650  10651 -18  10654 0

c  1+1 --> 2
c    (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0 ∧  p_18) -> (-b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0)
c  in CNF:
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_2
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨  b^{9, 3}_1
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ -p_18 ∨ -b^{9, 3}_0
c  in DIMACS:
 10649  10650 -10651 -18 -10652 0
 10649  10650 -10651 -18  10653 0
 10649  10650 -10651 -18 -10654 0

c  2+1 --> break 
c    (-b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧  p_18) -> break
c  in CNF:
c     b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 10649 -10650  10651 -18 1162 0


c  2-1 --> 1
c    (-b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧ -p_18) -> (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0)
c  in CNF:
c     b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_2
c     b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_1
c     b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨  b^{9, 3}_0
c  in DIMACS:
 10649 -10650  10651  18 -10652 0
 10649 -10650  10651  18 -10653 0
 10649 -10650  10651  18  10654 0

c  1-1 --> 0
c    (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0 ∧ -p_18) -> (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧ -b^{9, 3}_0)
c  in CNF:
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_2
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_1
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_0
c  in DIMACS:
 10649  10650 -10651  18 -10652 0
 10649  10650 -10651  18 -10653 0
 10649  10650 -10651  18 -10654 0

c  0-1 --> -1
c    (-b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧ -p_18) -> ( b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0)
c  in CNF:
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨  b^{9, 3}_2
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_1
c     b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨  b^{9, 3}_0
c  in DIMACS:
 10649  10650  10651  18  10652 0
 10649  10650  10651  18 -10653 0
 10649  10650  10651  18  10654 0

c  -1-1 --> -2
c    ( b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧  b^{9, 2}_0 ∧ -p_18) -> ( b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0)
c  in CNF:
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨  b^{9, 3}_2
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨  b^{9, 3}_1
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨  p_18 ∨ -b^{9, 3}_0
c  in DIMACS:
-10649  10650 -10651  18  10652 0
-10649  10650 -10651  18  10653 0
-10649  10650 -10651  18 -10654 0

c  -2-1 --> break 
c    ( b^{9, 2}_2 ∧  b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨  b^{9, 2}_0 ∨  p_18 ∨ break
c  in DIMACS:
-10649 -10650  10651  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 2}_2 ∧ -b^{9, 2}_1 ∧ -b^{9, 2}_0 ∧ true) 
c  in CNF:
c    -b^{9, 2}_2 ∨  b^{9, 2}_1 ∨  b^{9, 2}_0 ∨ false 
c  in DIMACS:
-10649  10650  10651  0

c  3 does not represent an automaton state.
c    -(-b^{9, 2}_2 ∧  b^{9, 2}_1 ∧  b^{9, 2}_0 ∧ true) 
c  in CNF:
c     b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ false 
c  in DIMACS:
 10649 -10650 -10651  0
c  -3 does not represent an automaton state.
c    -( b^{9, 2}_2 ∧  b^{9, 2}_1 ∧  b^{9, 2}_0 ∧ true) 
c  in CNF:
c    -b^{9, 2}_2 ∨ -b^{9, 2}_1 ∨ -b^{9, 2}_0 ∨ false 
c  in DIMACS:
-10649 -10650 -10651  0

c i = 3
c  -2+1 --> -1
c    ( b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧  p_27) -> ( b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0)
c  in CNF:
c    -b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨  b^{9, 4}_2
c    -b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_1
c    -b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨  b^{9, 4}_0
c  in DIMACS:
-10652 -10653  10654 -27  10655 0
-10652 -10653  10654 -27 -10656 0
-10652 -10653  10654 -27  10657 0

c  -1+1 --> 0
c    ( b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0 ∧  p_27) -> (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧ -b^{9, 4}_0)
c  in CNF:
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_2
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_1
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_0
c  in DIMACS:
-10652  10653 -10654 -27 -10655 0
-10652  10653 -10654 -27 -10656 0
-10652  10653 -10654 -27 -10657 0

c  0+1 --> 1
c    (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧  p_27) -> (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0)
c  in CNF:
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_2
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_1
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨  b^{9, 4}_0
c  in DIMACS:
 10652  10653  10654 -27 -10655 0
 10652  10653  10654 -27 -10656 0
 10652  10653  10654 -27  10657 0

c  1+1 --> 2
c    (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0 ∧  p_27) -> (-b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0)
c  in CNF:
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_2
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨  b^{9, 4}_1
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ -p_27 ∨ -b^{9, 4}_0
c  in DIMACS:
 10652  10653 -10654 -27 -10655 0
 10652  10653 -10654 -27  10656 0
 10652  10653 -10654 -27 -10657 0

c  2+1 --> break 
c    (-b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧  p_27) -> break
c  in CNF:
c     b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ -p_27 ∨ break
c  in DIMACS:
 10652 -10653  10654 -27 1162 0


c  2-1 --> 1
c    (-b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧ -p_27) -> (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0)
c  in CNF:
c     b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_2
c     b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_1
c     b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨  b^{9, 4}_0
c  in DIMACS:
 10652 -10653  10654  27 -10655 0
 10652 -10653  10654  27 -10656 0
 10652 -10653  10654  27  10657 0

c  1-1 --> 0
c    (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0 ∧ -p_27) -> (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧ -b^{9, 4}_0)
c  in CNF:
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_2
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_1
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_0
c  in DIMACS:
 10652  10653 -10654  27 -10655 0
 10652  10653 -10654  27 -10656 0
 10652  10653 -10654  27 -10657 0

c  0-1 --> -1
c    (-b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧ -p_27) -> ( b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0)
c  in CNF:
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨  b^{9, 4}_2
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_1
c     b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨  b^{9, 4}_0
c  in DIMACS:
 10652  10653  10654  27  10655 0
 10652  10653  10654  27 -10656 0
 10652  10653  10654  27  10657 0

c  -1-1 --> -2
c    ( b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧  b^{9, 3}_0 ∧ -p_27) -> ( b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0)
c  in CNF:
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨  b^{9, 4}_2
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨  b^{9, 4}_1
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨  p_27 ∨ -b^{9, 4}_0
c  in DIMACS:
-10652  10653 -10654  27  10655 0
-10652  10653 -10654  27  10656 0
-10652  10653 -10654  27 -10657 0

c  -2-1 --> break 
c    ( b^{9, 3}_2 ∧  b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧ -p_27) -> break
c  in CNF:
c    -b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨  b^{9, 3}_0 ∨  p_27 ∨ break
c  in DIMACS:
-10652 -10653  10654  27 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 3}_2 ∧ -b^{9, 3}_1 ∧ -b^{9, 3}_0 ∧ true) 
c  in CNF:
c    -b^{9, 3}_2 ∨  b^{9, 3}_1 ∨  b^{9, 3}_0 ∨ false 
c  in DIMACS:
-10652  10653  10654  0

c  3 does not represent an automaton state.
c    -(-b^{9, 3}_2 ∧  b^{9, 3}_1 ∧  b^{9, 3}_0 ∧ true) 
c  in CNF:
c     b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ false 
c  in DIMACS:
 10652 -10653 -10654  0
c  -3 does not represent an automaton state.
c    -( b^{9, 3}_2 ∧  b^{9, 3}_1 ∧  b^{9, 3}_0 ∧ true) 
c  in CNF:
c    -b^{9, 3}_2 ∨ -b^{9, 3}_1 ∨ -b^{9, 3}_0 ∨ false 
c  in DIMACS:
-10652 -10653 -10654  0

c i = 4
c  -2+1 --> -1
c    ( b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧  p_36) -> ( b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0)
c  in CNF:
c    -b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨  b^{9, 5}_2
c    -b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_1
c    -b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨  b^{9, 5}_0
c  in DIMACS:
-10655 -10656  10657 -36  10658 0
-10655 -10656  10657 -36 -10659 0
-10655 -10656  10657 -36  10660 0

c  -1+1 --> 0
c    ( b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0 ∧  p_36) -> (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧ -b^{9, 5}_0)
c  in CNF:
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_2
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_1
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_0
c  in DIMACS:
-10655  10656 -10657 -36 -10658 0
-10655  10656 -10657 -36 -10659 0
-10655  10656 -10657 -36 -10660 0

c  0+1 --> 1
c    (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧  p_36) -> (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0)
c  in CNF:
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_2
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_1
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨  b^{9, 5}_0
c  in DIMACS:
 10655  10656  10657 -36 -10658 0
 10655  10656  10657 -36 -10659 0
 10655  10656  10657 -36  10660 0

c  1+1 --> 2
c    (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0 ∧  p_36) -> (-b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0)
c  in CNF:
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_2
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨  b^{9, 5}_1
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ -p_36 ∨ -b^{9, 5}_0
c  in DIMACS:
 10655  10656 -10657 -36 -10658 0
 10655  10656 -10657 -36  10659 0
 10655  10656 -10657 -36 -10660 0

c  2+1 --> break 
c    (-b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧  p_36) -> break
c  in CNF:
c     b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 10655 -10656  10657 -36 1162 0


c  2-1 --> 1
c    (-b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧ -p_36) -> (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0)
c  in CNF:
c     b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_2
c     b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_1
c     b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨  b^{9, 5}_0
c  in DIMACS:
 10655 -10656  10657  36 -10658 0
 10655 -10656  10657  36 -10659 0
 10655 -10656  10657  36  10660 0

c  1-1 --> 0
c    (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0 ∧ -p_36) -> (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧ -b^{9, 5}_0)
c  in CNF:
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_2
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_1
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_0
c  in DIMACS:
 10655  10656 -10657  36 -10658 0
 10655  10656 -10657  36 -10659 0
 10655  10656 -10657  36 -10660 0

c  0-1 --> -1
c    (-b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧ -p_36) -> ( b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0)
c  in CNF:
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨  b^{9, 5}_2
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_1
c     b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨  b^{9, 5}_0
c  in DIMACS:
 10655  10656  10657  36  10658 0
 10655  10656  10657  36 -10659 0
 10655  10656  10657  36  10660 0

c  -1-1 --> -2
c    ( b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧  b^{9, 4}_0 ∧ -p_36) -> ( b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0)
c  in CNF:
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨  b^{9, 5}_2
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨  b^{9, 5}_1
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨  p_36 ∨ -b^{9, 5}_0
c  in DIMACS:
-10655  10656 -10657  36  10658 0
-10655  10656 -10657  36  10659 0
-10655  10656 -10657  36 -10660 0

c  -2-1 --> break 
c    ( b^{9, 4}_2 ∧  b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨  b^{9, 4}_0 ∨  p_36 ∨ break
c  in DIMACS:
-10655 -10656  10657  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 4}_2 ∧ -b^{9, 4}_1 ∧ -b^{9, 4}_0 ∧ true) 
c  in CNF:
c    -b^{9, 4}_2 ∨  b^{9, 4}_1 ∨  b^{9, 4}_0 ∨ false 
c  in DIMACS:
-10655  10656  10657  0

c  3 does not represent an automaton state.
c    -(-b^{9, 4}_2 ∧  b^{9, 4}_1 ∧  b^{9, 4}_0 ∧ true) 
c  in CNF:
c     b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ false 
c  in DIMACS:
 10655 -10656 -10657  0
c  -3 does not represent an automaton state.
c    -( b^{9, 4}_2 ∧  b^{9, 4}_1 ∧  b^{9, 4}_0 ∧ true) 
c  in CNF:
c    -b^{9, 4}_2 ∨ -b^{9, 4}_1 ∨ -b^{9, 4}_0 ∨ false 
c  in DIMACS:
-10655 -10656 -10657  0

c i = 5
c  -2+1 --> -1
c    ( b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧  p_45) -> ( b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0)
c  in CNF:
c    -b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨  b^{9, 6}_2
c    -b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_1
c    -b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨  b^{9, 6}_0
c  in DIMACS:
-10658 -10659  10660 -45  10661 0
-10658 -10659  10660 -45 -10662 0
-10658 -10659  10660 -45  10663 0

c  -1+1 --> 0
c    ( b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0 ∧  p_45) -> (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧ -b^{9, 6}_0)
c  in CNF:
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_2
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_1
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_0
c  in DIMACS:
-10658  10659 -10660 -45 -10661 0
-10658  10659 -10660 -45 -10662 0
-10658  10659 -10660 -45 -10663 0

c  0+1 --> 1
c    (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧  p_45) -> (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0)
c  in CNF:
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_2
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_1
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨  b^{9, 6}_0
c  in DIMACS:
 10658  10659  10660 -45 -10661 0
 10658  10659  10660 -45 -10662 0
 10658  10659  10660 -45  10663 0

c  1+1 --> 2
c    (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0 ∧  p_45) -> (-b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0)
c  in CNF:
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_2
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨  b^{9, 6}_1
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ -p_45 ∨ -b^{9, 6}_0
c  in DIMACS:
 10658  10659 -10660 -45 -10661 0
 10658  10659 -10660 -45  10662 0
 10658  10659 -10660 -45 -10663 0

c  2+1 --> break 
c    (-b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧  p_45) -> break
c  in CNF:
c     b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 10658 -10659  10660 -45 1162 0


c  2-1 --> 1
c    (-b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧ -p_45) -> (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0)
c  in CNF:
c     b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_2
c     b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_1
c     b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨  b^{9, 6}_0
c  in DIMACS:
 10658 -10659  10660  45 -10661 0
 10658 -10659  10660  45 -10662 0
 10658 -10659  10660  45  10663 0

c  1-1 --> 0
c    (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0 ∧ -p_45) -> (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧ -b^{9, 6}_0)
c  in CNF:
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_2
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_1
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_0
c  in DIMACS:
 10658  10659 -10660  45 -10661 0
 10658  10659 -10660  45 -10662 0
 10658  10659 -10660  45 -10663 0

c  0-1 --> -1
c    (-b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧ -p_45) -> ( b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0)
c  in CNF:
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨  b^{9, 6}_2
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_1
c     b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨  b^{9, 6}_0
c  in DIMACS:
 10658  10659  10660  45  10661 0
 10658  10659  10660  45 -10662 0
 10658  10659  10660  45  10663 0

c  -1-1 --> -2
c    ( b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧  b^{9, 5}_0 ∧ -p_45) -> ( b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0)
c  in CNF:
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨  b^{9, 6}_2
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨  b^{9, 6}_1
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨  p_45 ∨ -b^{9, 6}_0
c  in DIMACS:
-10658  10659 -10660  45  10661 0
-10658  10659 -10660  45  10662 0
-10658  10659 -10660  45 -10663 0

c  -2-1 --> break 
c    ( b^{9, 5}_2 ∧  b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨  b^{9, 5}_0 ∨  p_45 ∨ break
c  in DIMACS:
-10658 -10659  10660  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 5}_2 ∧ -b^{9, 5}_1 ∧ -b^{9, 5}_0 ∧ true) 
c  in CNF:
c    -b^{9, 5}_2 ∨  b^{9, 5}_1 ∨  b^{9, 5}_0 ∨ false 
c  in DIMACS:
-10658  10659  10660  0

c  3 does not represent an automaton state.
c    -(-b^{9, 5}_2 ∧  b^{9, 5}_1 ∧  b^{9, 5}_0 ∧ true) 
c  in CNF:
c     b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ false 
c  in DIMACS:
 10658 -10659 -10660  0
c  -3 does not represent an automaton state.
c    -( b^{9, 5}_2 ∧  b^{9, 5}_1 ∧  b^{9, 5}_0 ∧ true) 
c  in CNF:
c    -b^{9, 5}_2 ∨ -b^{9, 5}_1 ∨ -b^{9, 5}_0 ∨ false 
c  in DIMACS:
-10658 -10659 -10660  0

c i = 6
c  -2+1 --> -1
c    ( b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧  p_54) -> ( b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0)
c  in CNF:
c    -b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨  b^{9, 7}_2
c    -b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_1
c    -b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨  b^{9, 7}_0
c  in DIMACS:
-10661 -10662  10663 -54  10664 0
-10661 -10662  10663 -54 -10665 0
-10661 -10662  10663 -54  10666 0

c  -1+1 --> 0
c    ( b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0 ∧  p_54) -> (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧ -b^{9, 7}_0)
c  in CNF:
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_2
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_1
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_0
c  in DIMACS:
-10661  10662 -10663 -54 -10664 0
-10661  10662 -10663 -54 -10665 0
-10661  10662 -10663 -54 -10666 0

c  0+1 --> 1
c    (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧  p_54) -> (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0)
c  in CNF:
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_2
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_1
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨  b^{9, 7}_0
c  in DIMACS:
 10661  10662  10663 -54 -10664 0
 10661  10662  10663 -54 -10665 0
 10661  10662  10663 -54  10666 0

c  1+1 --> 2
c    (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0 ∧  p_54) -> (-b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0)
c  in CNF:
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_2
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨  b^{9, 7}_1
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ -p_54 ∨ -b^{9, 7}_0
c  in DIMACS:
 10661  10662 -10663 -54 -10664 0
 10661  10662 -10663 -54  10665 0
 10661  10662 -10663 -54 -10666 0

c  2+1 --> break 
c    (-b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧  p_54) -> break
c  in CNF:
c     b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 10661 -10662  10663 -54 1162 0


c  2-1 --> 1
c    (-b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧ -p_54) -> (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0)
c  in CNF:
c     b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_2
c     b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_1
c     b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨  b^{9, 7}_0
c  in DIMACS:
 10661 -10662  10663  54 -10664 0
 10661 -10662  10663  54 -10665 0
 10661 -10662  10663  54  10666 0

c  1-1 --> 0
c    (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0 ∧ -p_54) -> (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧ -b^{9, 7}_0)
c  in CNF:
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_2
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_1
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_0
c  in DIMACS:
 10661  10662 -10663  54 -10664 0
 10661  10662 -10663  54 -10665 0
 10661  10662 -10663  54 -10666 0

c  0-1 --> -1
c    (-b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧ -p_54) -> ( b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0)
c  in CNF:
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨  b^{9, 7}_2
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_1
c     b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨  b^{9, 7}_0
c  in DIMACS:
 10661  10662  10663  54  10664 0
 10661  10662  10663  54 -10665 0
 10661  10662  10663  54  10666 0

c  -1-1 --> -2
c    ( b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧  b^{9, 6}_0 ∧ -p_54) -> ( b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0)
c  in CNF:
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨  b^{9, 7}_2
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨  b^{9, 7}_1
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨  p_54 ∨ -b^{9, 7}_0
c  in DIMACS:
-10661  10662 -10663  54  10664 0
-10661  10662 -10663  54  10665 0
-10661  10662 -10663  54 -10666 0

c  -2-1 --> break 
c    ( b^{9, 6}_2 ∧  b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨  b^{9, 6}_0 ∨  p_54 ∨ break
c  in DIMACS:
-10661 -10662  10663  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 6}_2 ∧ -b^{9, 6}_1 ∧ -b^{9, 6}_0 ∧ true) 
c  in CNF:
c    -b^{9, 6}_2 ∨  b^{9, 6}_1 ∨  b^{9, 6}_0 ∨ false 
c  in DIMACS:
-10661  10662  10663  0

c  3 does not represent an automaton state.
c    -(-b^{9, 6}_2 ∧  b^{9, 6}_1 ∧  b^{9, 6}_0 ∧ true) 
c  in CNF:
c     b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ false 
c  in DIMACS:
 10661 -10662 -10663  0
c  -3 does not represent an automaton state.
c    -( b^{9, 6}_2 ∧  b^{9, 6}_1 ∧  b^{9, 6}_0 ∧ true) 
c  in CNF:
c    -b^{9, 6}_2 ∨ -b^{9, 6}_1 ∨ -b^{9, 6}_0 ∨ false 
c  in DIMACS:
-10661 -10662 -10663  0

c i = 7
c  -2+1 --> -1
c    ( b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧  p_63) -> ( b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0)
c  in CNF:
c    -b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨  b^{9, 8}_2
c    -b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_1
c    -b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨  b^{9, 8}_0
c  in DIMACS:
-10664 -10665  10666 -63  10667 0
-10664 -10665  10666 -63 -10668 0
-10664 -10665  10666 -63  10669 0

c  -1+1 --> 0
c    ( b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0 ∧  p_63) -> (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧ -b^{9, 8}_0)
c  in CNF:
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_2
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_1
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_0
c  in DIMACS:
-10664  10665 -10666 -63 -10667 0
-10664  10665 -10666 -63 -10668 0
-10664  10665 -10666 -63 -10669 0

c  0+1 --> 1
c    (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧  p_63) -> (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0)
c  in CNF:
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_2
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_1
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨  b^{9, 8}_0
c  in DIMACS:
 10664  10665  10666 -63 -10667 0
 10664  10665  10666 -63 -10668 0
 10664  10665  10666 -63  10669 0

c  1+1 --> 2
c    (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0 ∧  p_63) -> (-b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0)
c  in CNF:
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_2
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨  b^{9, 8}_1
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ -p_63 ∨ -b^{9, 8}_0
c  in DIMACS:
 10664  10665 -10666 -63 -10667 0
 10664  10665 -10666 -63  10668 0
 10664  10665 -10666 -63 -10669 0

c  2+1 --> break 
c    (-b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧  p_63) -> break
c  in CNF:
c     b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 10664 -10665  10666 -63 1162 0


c  2-1 --> 1
c    (-b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧ -p_63) -> (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0)
c  in CNF:
c     b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_2
c     b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_1
c     b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨  b^{9, 8}_0
c  in DIMACS:
 10664 -10665  10666  63 -10667 0
 10664 -10665  10666  63 -10668 0
 10664 -10665  10666  63  10669 0

c  1-1 --> 0
c    (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0 ∧ -p_63) -> (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧ -b^{9, 8}_0)
c  in CNF:
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_2
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_1
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_0
c  in DIMACS:
 10664  10665 -10666  63 -10667 0
 10664  10665 -10666  63 -10668 0
 10664  10665 -10666  63 -10669 0

c  0-1 --> -1
c    (-b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧ -p_63) -> ( b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0)
c  in CNF:
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨  b^{9, 8}_2
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_1
c     b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨  b^{9, 8}_0
c  in DIMACS:
 10664  10665  10666  63  10667 0
 10664  10665  10666  63 -10668 0
 10664  10665  10666  63  10669 0

c  -1-1 --> -2
c    ( b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧  b^{9, 7}_0 ∧ -p_63) -> ( b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0)
c  in CNF:
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨  b^{9, 8}_2
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨  b^{9, 8}_1
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨  p_63 ∨ -b^{9, 8}_0
c  in DIMACS:
-10664  10665 -10666  63  10667 0
-10664  10665 -10666  63  10668 0
-10664  10665 -10666  63 -10669 0

c  -2-1 --> break 
c    ( b^{9, 7}_2 ∧  b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨  b^{9, 7}_0 ∨  p_63 ∨ break
c  in DIMACS:
-10664 -10665  10666  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 7}_2 ∧ -b^{9, 7}_1 ∧ -b^{9, 7}_0 ∧ true) 
c  in CNF:
c    -b^{9, 7}_2 ∨  b^{9, 7}_1 ∨  b^{9, 7}_0 ∨ false 
c  in DIMACS:
-10664  10665  10666  0

c  3 does not represent an automaton state.
c    -(-b^{9, 7}_2 ∧  b^{9, 7}_1 ∧  b^{9, 7}_0 ∧ true) 
c  in CNF:
c     b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ false 
c  in DIMACS:
 10664 -10665 -10666  0
c  -3 does not represent an automaton state.
c    -( b^{9, 7}_2 ∧  b^{9, 7}_1 ∧  b^{9, 7}_0 ∧ true) 
c  in CNF:
c    -b^{9, 7}_2 ∨ -b^{9, 7}_1 ∨ -b^{9, 7}_0 ∨ false 
c  in DIMACS:
-10664 -10665 -10666  0

c i = 8
c  -2+1 --> -1
c    ( b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧  p_72) -> ( b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0)
c  in CNF:
c    -b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨  b^{9, 9}_2
c    -b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_1
c    -b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨  b^{9, 9}_0
c  in DIMACS:
-10667 -10668  10669 -72  10670 0
-10667 -10668  10669 -72 -10671 0
-10667 -10668  10669 -72  10672 0

c  -1+1 --> 0
c    ( b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0 ∧  p_72) -> (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧ -b^{9, 9}_0)
c  in CNF:
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_2
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_1
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_0
c  in DIMACS:
-10667  10668 -10669 -72 -10670 0
-10667  10668 -10669 -72 -10671 0
-10667  10668 -10669 -72 -10672 0

c  0+1 --> 1
c    (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧  p_72) -> (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0)
c  in CNF:
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_2
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_1
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨  b^{9, 9}_0
c  in DIMACS:
 10667  10668  10669 -72 -10670 0
 10667  10668  10669 -72 -10671 0
 10667  10668  10669 -72  10672 0

c  1+1 --> 2
c    (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0 ∧  p_72) -> (-b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0)
c  in CNF:
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_2
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨  b^{9, 9}_1
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ -p_72 ∨ -b^{9, 9}_0
c  in DIMACS:
 10667  10668 -10669 -72 -10670 0
 10667  10668 -10669 -72  10671 0
 10667  10668 -10669 -72 -10672 0

c  2+1 --> break 
c    (-b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧  p_72) -> break
c  in CNF:
c     b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 10667 -10668  10669 -72 1162 0


c  2-1 --> 1
c    (-b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧ -p_72) -> (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0)
c  in CNF:
c     b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_2
c     b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_1
c     b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨  b^{9, 9}_0
c  in DIMACS:
 10667 -10668  10669  72 -10670 0
 10667 -10668  10669  72 -10671 0
 10667 -10668  10669  72  10672 0

c  1-1 --> 0
c    (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0 ∧ -p_72) -> (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧ -b^{9, 9}_0)
c  in CNF:
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_2
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_1
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_0
c  in DIMACS:
 10667  10668 -10669  72 -10670 0
 10667  10668 -10669  72 -10671 0
 10667  10668 -10669  72 -10672 0

c  0-1 --> -1
c    (-b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧ -p_72) -> ( b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0)
c  in CNF:
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨  b^{9, 9}_2
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_1
c     b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨  b^{9, 9}_0
c  in DIMACS:
 10667  10668  10669  72  10670 0
 10667  10668  10669  72 -10671 0
 10667  10668  10669  72  10672 0

c  -1-1 --> -2
c    ( b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧  b^{9, 8}_0 ∧ -p_72) -> ( b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0)
c  in CNF:
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨  b^{9, 9}_2
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨  b^{9, 9}_1
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨  p_72 ∨ -b^{9, 9}_0
c  in DIMACS:
-10667  10668 -10669  72  10670 0
-10667  10668 -10669  72  10671 0
-10667  10668 -10669  72 -10672 0

c  -2-1 --> break 
c    ( b^{9, 8}_2 ∧  b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨  b^{9, 8}_0 ∨  p_72 ∨ break
c  in DIMACS:
-10667 -10668  10669  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 8}_2 ∧ -b^{9, 8}_1 ∧ -b^{9, 8}_0 ∧ true) 
c  in CNF:
c    -b^{9, 8}_2 ∨  b^{9, 8}_1 ∨  b^{9, 8}_0 ∨ false 
c  in DIMACS:
-10667  10668  10669  0

c  3 does not represent an automaton state.
c    -(-b^{9, 8}_2 ∧  b^{9, 8}_1 ∧  b^{9, 8}_0 ∧ true) 
c  in CNF:
c     b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ false 
c  in DIMACS:
 10667 -10668 -10669  0
c  -3 does not represent an automaton state.
c    -( b^{9, 8}_2 ∧  b^{9, 8}_1 ∧  b^{9, 8}_0 ∧ true) 
c  in CNF:
c    -b^{9, 8}_2 ∨ -b^{9, 8}_1 ∨ -b^{9, 8}_0 ∨ false 
c  in DIMACS:
-10667 -10668 -10669  0

c i = 9
c  -2+1 --> -1
c    ( b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧  p_81) -> ( b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0)
c  in CNF:
c    -b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨  b^{9, 10}_2
c    -b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_1
c    -b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨  b^{9, 10}_0
c  in DIMACS:
-10670 -10671  10672 -81  10673 0
-10670 -10671  10672 -81 -10674 0
-10670 -10671  10672 -81  10675 0

c  -1+1 --> 0
c    ( b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0 ∧  p_81) -> (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧ -b^{9, 10}_0)
c  in CNF:
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_2
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_1
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_0
c  in DIMACS:
-10670  10671 -10672 -81 -10673 0
-10670  10671 -10672 -81 -10674 0
-10670  10671 -10672 -81 -10675 0

c  0+1 --> 1
c    (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧  p_81) -> (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0)
c  in CNF:
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_2
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_1
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨  b^{9, 10}_0
c  in DIMACS:
 10670  10671  10672 -81 -10673 0
 10670  10671  10672 -81 -10674 0
 10670  10671  10672 -81  10675 0

c  1+1 --> 2
c    (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0 ∧  p_81) -> (-b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0)
c  in CNF:
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_2
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨  b^{9, 10}_1
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ -p_81 ∨ -b^{9, 10}_0
c  in DIMACS:
 10670  10671 -10672 -81 -10673 0
 10670  10671 -10672 -81  10674 0
 10670  10671 -10672 -81 -10675 0

c  2+1 --> break 
c    (-b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧  p_81) -> break
c  in CNF:
c     b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ -p_81 ∨ break
c  in DIMACS:
 10670 -10671  10672 -81 1162 0


c  2-1 --> 1
c    (-b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧ -p_81) -> (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0)
c  in CNF:
c     b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_2
c     b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_1
c     b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨  b^{9, 10}_0
c  in DIMACS:
 10670 -10671  10672  81 -10673 0
 10670 -10671  10672  81 -10674 0
 10670 -10671  10672  81  10675 0

c  1-1 --> 0
c    (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0 ∧ -p_81) -> (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧ -b^{9, 10}_0)
c  in CNF:
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_2
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_1
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_0
c  in DIMACS:
 10670  10671 -10672  81 -10673 0
 10670  10671 -10672  81 -10674 0
 10670  10671 -10672  81 -10675 0

c  0-1 --> -1
c    (-b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧ -p_81) -> ( b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0)
c  in CNF:
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨  b^{9, 10}_2
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_1
c     b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨  b^{9, 10}_0
c  in DIMACS:
 10670  10671  10672  81  10673 0
 10670  10671  10672  81 -10674 0
 10670  10671  10672  81  10675 0

c  -1-1 --> -2
c    ( b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧  b^{9, 9}_0 ∧ -p_81) -> ( b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0)
c  in CNF:
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨  b^{9, 10}_2
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨  b^{9, 10}_1
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨  p_81 ∨ -b^{9, 10}_0
c  in DIMACS:
-10670  10671 -10672  81  10673 0
-10670  10671 -10672  81  10674 0
-10670  10671 -10672  81 -10675 0

c  -2-1 --> break 
c    ( b^{9, 9}_2 ∧  b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧ -p_81) -> break
c  in CNF:
c    -b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨  b^{9, 9}_0 ∨  p_81 ∨ break
c  in DIMACS:
-10670 -10671  10672  81 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 9}_2 ∧ -b^{9, 9}_1 ∧ -b^{9, 9}_0 ∧ true) 
c  in CNF:
c    -b^{9, 9}_2 ∨  b^{9, 9}_1 ∨  b^{9, 9}_0 ∨ false 
c  in DIMACS:
-10670  10671  10672  0

c  3 does not represent an automaton state.
c    -(-b^{9, 9}_2 ∧  b^{9, 9}_1 ∧  b^{9, 9}_0 ∧ true) 
c  in CNF:
c     b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ false 
c  in DIMACS:
 10670 -10671 -10672  0
c  -3 does not represent an automaton state.
c    -( b^{9, 9}_2 ∧  b^{9, 9}_1 ∧  b^{9, 9}_0 ∧ true) 
c  in CNF:
c    -b^{9, 9}_2 ∨ -b^{9, 9}_1 ∨ -b^{9, 9}_0 ∨ false 
c  in DIMACS:
-10670 -10671 -10672  0

c i = 10
c  -2+1 --> -1
c    ( b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧  p_90) -> ( b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0)
c  in CNF:
c    -b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨  b^{9, 11}_2
c    -b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_1
c    -b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨  b^{9, 11}_0
c  in DIMACS:
-10673 -10674  10675 -90  10676 0
-10673 -10674  10675 -90 -10677 0
-10673 -10674  10675 -90  10678 0

c  -1+1 --> 0
c    ( b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0 ∧  p_90) -> (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧ -b^{9, 11}_0)
c  in CNF:
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_2
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_1
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_0
c  in DIMACS:
-10673  10674 -10675 -90 -10676 0
-10673  10674 -10675 -90 -10677 0
-10673  10674 -10675 -90 -10678 0

c  0+1 --> 1
c    (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧  p_90) -> (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0)
c  in CNF:
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_2
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_1
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨  b^{9, 11}_0
c  in DIMACS:
 10673  10674  10675 -90 -10676 0
 10673  10674  10675 -90 -10677 0
 10673  10674  10675 -90  10678 0

c  1+1 --> 2
c    (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0 ∧  p_90) -> (-b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0)
c  in CNF:
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_2
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨  b^{9, 11}_1
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ -p_90 ∨ -b^{9, 11}_0
c  in DIMACS:
 10673  10674 -10675 -90 -10676 0
 10673  10674 -10675 -90  10677 0
 10673  10674 -10675 -90 -10678 0

c  2+1 --> break 
c    (-b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧  p_90) -> break
c  in CNF:
c     b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 10673 -10674  10675 -90 1162 0


c  2-1 --> 1
c    (-b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧ -p_90) -> (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0)
c  in CNF:
c     b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_2
c     b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_1
c     b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨  b^{9, 11}_0
c  in DIMACS:
 10673 -10674  10675  90 -10676 0
 10673 -10674  10675  90 -10677 0
 10673 -10674  10675  90  10678 0

c  1-1 --> 0
c    (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0 ∧ -p_90) -> (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧ -b^{9, 11}_0)
c  in CNF:
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_2
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_1
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_0
c  in DIMACS:
 10673  10674 -10675  90 -10676 0
 10673  10674 -10675  90 -10677 0
 10673  10674 -10675  90 -10678 0

c  0-1 --> -1
c    (-b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧ -p_90) -> ( b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0)
c  in CNF:
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨  b^{9, 11}_2
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_1
c     b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨  b^{9, 11}_0
c  in DIMACS:
 10673  10674  10675  90  10676 0
 10673  10674  10675  90 -10677 0
 10673  10674  10675  90  10678 0

c  -1-1 --> -2
c    ( b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧  b^{9, 10}_0 ∧ -p_90) -> ( b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0)
c  in CNF:
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨  b^{9, 11}_2
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨  b^{9, 11}_1
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨  p_90 ∨ -b^{9, 11}_0
c  in DIMACS:
-10673  10674 -10675  90  10676 0
-10673  10674 -10675  90  10677 0
-10673  10674 -10675  90 -10678 0

c  -2-1 --> break 
c    ( b^{9, 10}_2 ∧  b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨  b^{9, 10}_0 ∨  p_90 ∨ break
c  in DIMACS:
-10673 -10674  10675  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 10}_2 ∧ -b^{9, 10}_1 ∧ -b^{9, 10}_0 ∧ true) 
c  in CNF:
c    -b^{9, 10}_2 ∨  b^{9, 10}_1 ∨  b^{9, 10}_0 ∨ false 
c  in DIMACS:
-10673  10674  10675  0

c  3 does not represent an automaton state.
c    -(-b^{9, 10}_2 ∧  b^{9, 10}_1 ∧  b^{9, 10}_0 ∧ true) 
c  in CNF:
c     b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ false 
c  in DIMACS:
 10673 -10674 -10675  0
c  -3 does not represent an automaton state.
c    -( b^{9, 10}_2 ∧  b^{9, 10}_1 ∧  b^{9, 10}_0 ∧ true) 
c  in CNF:
c    -b^{9, 10}_2 ∨ -b^{9, 10}_1 ∨ -b^{9, 10}_0 ∨ false 
c  in DIMACS:
-10673 -10674 -10675  0

c i = 11
c  -2+1 --> -1
c    ( b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧  p_99) -> ( b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0)
c  in CNF:
c    -b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨  b^{9, 12}_2
c    -b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_1
c    -b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨  b^{9, 12}_0
c  in DIMACS:
-10676 -10677  10678 -99  10679 0
-10676 -10677  10678 -99 -10680 0
-10676 -10677  10678 -99  10681 0

c  -1+1 --> 0
c    ( b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0 ∧  p_99) -> (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧ -b^{9, 12}_0)
c  in CNF:
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_2
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_1
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_0
c  in DIMACS:
-10676  10677 -10678 -99 -10679 0
-10676  10677 -10678 -99 -10680 0
-10676  10677 -10678 -99 -10681 0

c  0+1 --> 1
c    (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧  p_99) -> (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0)
c  in CNF:
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_2
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_1
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨  b^{9, 12}_0
c  in DIMACS:
 10676  10677  10678 -99 -10679 0
 10676  10677  10678 -99 -10680 0
 10676  10677  10678 -99  10681 0

c  1+1 --> 2
c    (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0 ∧  p_99) -> (-b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0)
c  in CNF:
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_2
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨  b^{9, 12}_1
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ -p_99 ∨ -b^{9, 12}_0
c  in DIMACS:
 10676  10677 -10678 -99 -10679 0
 10676  10677 -10678 -99  10680 0
 10676  10677 -10678 -99 -10681 0

c  2+1 --> break 
c    (-b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧  p_99) -> break
c  in CNF:
c     b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 10676 -10677  10678 -99 1162 0


c  2-1 --> 1
c    (-b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧ -p_99) -> (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0)
c  in CNF:
c     b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_2
c     b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_1
c     b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨  b^{9, 12}_0
c  in DIMACS:
 10676 -10677  10678  99 -10679 0
 10676 -10677  10678  99 -10680 0
 10676 -10677  10678  99  10681 0

c  1-1 --> 0
c    (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0 ∧ -p_99) -> (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧ -b^{9, 12}_0)
c  in CNF:
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_2
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_1
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_0
c  in DIMACS:
 10676  10677 -10678  99 -10679 0
 10676  10677 -10678  99 -10680 0
 10676  10677 -10678  99 -10681 0

c  0-1 --> -1
c    (-b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧ -p_99) -> ( b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0)
c  in CNF:
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨  b^{9, 12}_2
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_1
c     b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨  b^{9, 12}_0
c  in DIMACS:
 10676  10677  10678  99  10679 0
 10676  10677  10678  99 -10680 0
 10676  10677  10678  99  10681 0

c  -1-1 --> -2
c    ( b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧  b^{9, 11}_0 ∧ -p_99) -> ( b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0)
c  in CNF:
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨  b^{9, 12}_2
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨  b^{9, 12}_1
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨  p_99 ∨ -b^{9, 12}_0
c  in DIMACS:
-10676  10677 -10678  99  10679 0
-10676  10677 -10678  99  10680 0
-10676  10677 -10678  99 -10681 0

c  -2-1 --> break 
c    ( b^{9, 11}_2 ∧  b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨  b^{9, 11}_0 ∨  p_99 ∨ break
c  in DIMACS:
-10676 -10677  10678  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 11}_2 ∧ -b^{9, 11}_1 ∧ -b^{9, 11}_0 ∧ true) 
c  in CNF:
c    -b^{9, 11}_2 ∨  b^{9, 11}_1 ∨  b^{9, 11}_0 ∨ false 
c  in DIMACS:
-10676  10677  10678  0

c  3 does not represent an automaton state.
c    -(-b^{9, 11}_2 ∧  b^{9, 11}_1 ∧  b^{9, 11}_0 ∧ true) 
c  in CNF:
c     b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ false 
c  in DIMACS:
 10676 -10677 -10678  0
c  -3 does not represent an automaton state.
c    -( b^{9, 11}_2 ∧  b^{9, 11}_1 ∧  b^{9, 11}_0 ∧ true) 
c  in CNF:
c    -b^{9, 11}_2 ∨ -b^{9, 11}_1 ∨ -b^{9, 11}_0 ∨ false 
c  in DIMACS:
-10676 -10677 -10678  0

c i = 12
c  -2+1 --> -1
c    ( b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧  p_108) -> ( b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0)
c  in CNF:
c    -b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨  b^{9, 13}_2
c    -b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_1
c    -b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨  b^{9, 13}_0
c  in DIMACS:
-10679 -10680  10681 -108  10682 0
-10679 -10680  10681 -108 -10683 0
-10679 -10680  10681 -108  10684 0

c  -1+1 --> 0
c    ( b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0 ∧  p_108) -> (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧ -b^{9, 13}_0)
c  in CNF:
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_2
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_1
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_0
c  in DIMACS:
-10679  10680 -10681 -108 -10682 0
-10679  10680 -10681 -108 -10683 0
-10679  10680 -10681 -108 -10684 0

c  0+1 --> 1
c    (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧  p_108) -> (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0)
c  in CNF:
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_2
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_1
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨  b^{9, 13}_0
c  in DIMACS:
 10679  10680  10681 -108 -10682 0
 10679  10680  10681 -108 -10683 0
 10679  10680  10681 -108  10684 0

c  1+1 --> 2
c    (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0 ∧  p_108) -> (-b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0)
c  in CNF:
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_2
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨  b^{9, 13}_1
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ -p_108 ∨ -b^{9, 13}_0
c  in DIMACS:
 10679  10680 -10681 -108 -10682 0
 10679  10680 -10681 -108  10683 0
 10679  10680 -10681 -108 -10684 0

c  2+1 --> break 
c    (-b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧  p_108) -> break
c  in CNF:
c     b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 10679 -10680  10681 -108 1162 0


c  2-1 --> 1
c    (-b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧ -p_108) -> (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0)
c  in CNF:
c     b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_2
c     b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_1
c     b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨  b^{9, 13}_0
c  in DIMACS:
 10679 -10680  10681  108 -10682 0
 10679 -10680  10681  108 -10683 0
 10679 -10680  10681  108  10684 0

c  1-1 --> 0
c    (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0 ∧ -p_108) -> (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧ -b^{9, 13}_0)
c  in CNF:
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_2
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_1
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_0
c  in DIMACS:
 10679  10680 -10681  108 -10682 0
 10679  10680 -10681  108 -10683 0
 10679  10680 -10681  108 -10684 0

c  0-1 --> -1
c    (-b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧ -p_108) -> ( b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0)
c  in CNF:
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨  b^{9, 13}_2
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_1
c     b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨  b^{9, 13}_0
c  in DIMACS:
 10679  10680  10681  108  10682 0
 10679  10680  10681  108 -10683 0
 10679  10680  10681  108  10684 0

c  -1-1 --> -2
c    ( b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧  b^{9, 12}_0 ∧ -p_108) -> ( b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0)
c  in CNF:
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨  b^{9, 13}_2
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨  b^{9, 13}_1
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨  p_108 ∨ -b^{9, 13}_0
c  in DIMACS:
-10679  10680 -10681  108  10682 0
-10679  10680 -10681  108  10683 0
-10679  10680 -10681  108 -10684 0

c  -2-1 --> break 
c    ( b^{9, 12}_2 ∧  b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨  b^{9, 12}_0 ∨  p_108 ∨ break
c  in DIMACS:
-10679 -10680  10681  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 12}_2 ∧ -b^{9, 12}_1 ∧ -b^{9, 12}_0 ∧ true) 
c  in CNF:
c    -b^{9, 12}_2 ∨  b^{9, 12}_1 ∨  b^{9, 12}_0 ∨ false 
c  in DIMACS:
-10679  10680  10681  0

c  3 does not represent an automaton state.
c    -(-b^{9, 12}_2 ∧  b^{9, 12}_1 ∧  b^{9, 12}_0 ∧ true) 
c  in CNF:
c     b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ false 
c  in DIMACS:
 10679 -10680 -10681  0
c  -3 does not represent an automaton state.
c    -( b^{9, 12}_2 ∧  b^{9, 12}_1 ∧  b^{9, 12}_0 ∧ true) 
c  in CNF:
c    -b^{9, 12}_2 ∨ -b^{9, 12}_1 ∨ -b^{9, 12}_0 ∨ false 
c  in DIMACS:
-10679 -10680 -10681  0

c i = 13
c  -2+1 --> -1
c    ( b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧  p_117) -> ( b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0)
c  in CNF:
c    -b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨  b^{9, 14}_2
c    -b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_1
c    -b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨  b^{9, 14}_0
c  in DIMACS:
-10682 -10683  10684 -117  10685 0
-10682 -10683  10684 -117 -10686 0
-10682 -10683  10684 -117  10687 0

c  -1+1 --> 0
c    ( b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0 ∧  p_117) -> (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧ -b^{9, 14}_0)
c  in CNF:
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_2
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_1
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_0
c  in DIMACS:
-10682  10683 -10684 -117 -10685 0
-10682  10683 -10684 -117 -10686 0
-10682  10683 -10684 -117 -10687 0

c  0+1 --> 1
c    (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧  p_117) -> (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0)
c  in CNF:
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_2
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_1
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨  b^{9, 14}_0
c  in DIMACS:
 10682  10683  10684 -117 -10685 0
 10682  10683  10684 -117 -10686 0
 10682  10683  10684 -117  10687 0

c  1+1 --> 2
c    (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0 ∧  p_117) -> (-b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0)
c  in CNF:
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_2
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨  b^{9, 14}_1
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ -p_117 ∨ -b^{9, 14}_0
c  in DIMACS:
 10682  10683 -10684 -117 -10685 0
 10682  10683 -10684 -117  10686 0
 10682  10683 -10684 -117 -10687 0

c  2+1 --> break 
c    (-b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧  p_117) -> break
c  in CNF:
c     b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 10682 -10683  10684 -117 1162 0


c  2-1 --> 1
c    (-b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧ -p_117) -> (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0)
c  in CNF:
c     b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_2
c     b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_1
c     b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨  b^{9, 14}_0
c  in DIMACS:
 10682 -10683  10684  117 -10685 0
 10682 -10683  10684  117 -10686 0
 10682 -10683  10684  117  10687 0

c  1-1 --> 0
c    (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0 ∧ -p_117) -> (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧ -b^{9, 14}_0)
c  in CNF:
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_2
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_1
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_0
c  in DIMACS:
 10682  10683 -10684  117 -10685 0
 10682  10683 -10684  117 -10686 0
 10682  10683 -10684  117 -10687 0

c  0-1 --> -1
c    (-b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧ -p_117) -> ( b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0)
c  in CNF:
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨  b^{9, 14}_2
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_1
c     b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨  b^{9, 14}_0
c  in DIMACS:
 10682  10683  10684  117  10685 0
 10682  10683  10684  117 -10686 0
 10682  10683  10684  117  10687 0

c  -1-1 --> -2
c    ( b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧  b^{9, 13}_0 ∧ -p_117) -> ( b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0)
c  in CNF:
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨  b^{9, 14}_2
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨  b^{9, 14}_1
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨  p_117 ∨ -b^{9, 14}_0
c  in DIMACS:
-10682  10683 -10684  117  10685 0
-10682  10683 -10684  117  10686 0
-10682  10683 -10684  117 -10687 0

c  -2-1 --> break 
c    ( b^{9, 13}_2 ∧  b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨  b^{9, 13}_0 ∨  p_117 ∨ break
c  in DIMACS:
-10682 -10683  10684  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 13}_2 ∧ -b^{9, 13}_1 ∧ -b^{9, 13}_0 ∧ true) 
c  in CNF:
c    -b^{9, 13}_2 ∨  b^{9, 13}_1 ∨  b^{9, 13}_0 ∨ false 
c  in DIMACS:
-10682  10683  10684  0

c  3 does not represent an automaton state.
c    -(-b^{9, 13}_2 ∧  b^{9, 13}_1 ∧  b^{9, 13}_0 ∧ true) 
c  in CNF:
c     b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ false 
c  in DIMACS:
 10682 -10683 -10684  0
c  -3 does not represent an automaton state.
c    -( b^{9, 13}_2 ∧  b^{9, 13}_1 ∧  b^{9, 13}_0 ∧ true) 
c  in CNF:
c    -b^{9, 13}_2 ∨ -b^{9, 13}_1 ∨ -b^{9, 13}_0 ∨ false 
c  in DIMACS:
-10682 -10683 -10684  0

c i = 14
c  -2+1 --> -1
c    ( b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧  p_126) -> ( b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0)
c  in CNF:
c    -b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨  b^{9, 15}_2
c    -b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_1
c    -b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨  b^{9, 15}_0
c  in DIMACS:
-10685 -10686  10687 -126  10688 0
-10685 -10686  10687 -126 -10689 0
-10685 -10686  10687 -126  10690 0

c  -1+1 --> 0
c    ( b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0 ∧  p_126) -> (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧ -b^{9, 15}_0)
c  in CNF:
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_2
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_1
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_0
c  in DIMACS:
-10685  10686 -10687 -126 -10688 0
-10685  10686 -10687 -126 -10689 0
-10685  10686 -10687 -126 -10690 0

c  0+1 --> 1
c    (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧  p_126) -> (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0)
c  in CNF:
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_2
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_1
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨  b^{9, 15}_0
c  in DIMACS:
 10685  10686  10687 -126 -10688 0
 10685  10686  10687 -126 -10689 0
 10685  10686  10687 -126  10690 0

c  1+1 --> 2
c    (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0 ∧  p_126) -> (-b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0)
c  in CNF:
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_2
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨  b^{9, 15}_1
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ -p_126 ∨ -b^{9, 15}_0
c  in DIMACS:
 10685  10686 -10687 -126 -10688 0
 10685  10686 -10687 -126  10689 0
 10685  10686 -10687 -126 -10690 0

c  2+1 --> break 
c    (-b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧  p_126) -> break
c  in CNF:
c     b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 10685 -10686  10687 -126 1162 0


c  2-1 --> 1
c    (-b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧ -p_126) -> (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0)
c  in CNF:
c     b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_2
c     b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_1
c     b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨  b^{9, 15}_0
c  in DIMACS:
 10685 -10686  10687  126 -10688 0
 10685 -10686  10687  126 -10689 0
 10685 -10686  10687  126  10690 0

c  1-1 --> 0
c    (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0 ∧ -p_126) -> (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧ -b^{9, 15}_0)
c  in CNF:
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_2
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_1
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_0
c  in DIMACS:
 10685  10686 -10687  126 -10688 0
 10685  10686 -10687  126 -10689 0
 10685  10686 -10687  126 -10690 0

c  0-1 --> -1
c    (-b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧ -p_126) -> ( b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0)
c  in CNF:
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨  b^{9, 15}_2
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_1
c     b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨  b^{9, 15}_0
c  in DIMACS:
 10685  10686  10687  126  10688 0
 10685  10686  10687  126 -10689 0
 10685  10686  10687  126  10690 0

c  -1-1 --> -2
c    ( b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧  b^{9, 14}_0 ∧ -p_126) -> ( b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0)
c  in CNF:
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨  b^{9, 15}_2
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨  b^{9, 15}_1
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨  p_126 ∨ -b^{9, 15}_0
c  in DIMACS:
-10685  10686 -10687  126  10688 0
-10685  10686 -10687  126  10689 0
-10685  10686 -10687  126 -10690 0

c  -2-1 --> break 
c    ( b^{9, 14}_2 ∧  b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨  b^{9, 14}_0 ∨  p_126 ∨ break
c  in DIMACS:
-10685 -10686  10687  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 14}_2 ∧ -b^{9, 14}_1 ∧ -b^{9, 14}_0 ∧ true) 
c  in CNF:
c    -b^{9, 14}_2 ∨  b^{9, 14}_1 ∨  b^{9, 14}_0 ∨ false 
c  in DIMACS:
-10685  10686  10687  0

c  3 does not represent an automaton state.
c    -(-b^{9, 14}_2 ∧  b^{9, 14}_1 ∧  b^{9, 14}_0 ∧ true) 
c  in CNF:
c     b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ false 
c  in DIMACS:
 10685 -10686 -10687  0
c  -3 does not represent an automaton state.
c    -( b^{9, 14}_2 ∧  b^{9, 14}_1 ∧  b^{9, 14}_0 ∧ true) 
c  in CNF:
c    -b^{9, 14}_2 ∨ -b^{9, 14}_1 ∨ -b^{9, 14}_0 ∨ false 
c  in DIMACS:
-10685 -10686 -10687  0

c i = 15
c  -2+1 --> -1
c    ( b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧  p_135) -> ( b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0)
c  in CNF:
c    -b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨  b^{9, 16}_2
c    -b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_1
c    -b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨  b^{9, 16}_0
c  in DIMACS:
-10688 -10689  10690 -135  10691 0
-10688 -10689  10690 -135 -10692 0
-10688 -10689  10690 -135  10693 0

c  -1+1 --> 0
c    ( b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0 ∧  p_135) -> (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧ -b^{9, 16}_0)
c  in CNF:
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_2
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_1
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_0
c  in DIMACS:
-10688  10689 -10690 -135 -10691 0
-10688  10689 -10690 -135 -10692 0
-10688  10689 -10690 -135 -10693 0

c  0+1 --> 1
c    (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧  p_135) -> (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0)
c  in CNF:
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_2
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_1
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨  b^{9, 16}_0
c  in DIMACS:
 10688  10689  10690 -135 -10691 0
 10688  10689  10690 -135 -10692 0
 10688  10689  10690 -135  10693 0

c  1+1 --> 2
c    (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0 ∧  p_135) -> (-b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0)
c  in CNF:
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_2
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨  b^{9, 16}_1
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ -p_135 ∨ -b^{9, 16}_0
c  in DIMACS:
 10688  10689 -10690 -135 -10691 0
 10688  10689 -10690 -135  10692 0
 10688  10689 -10690 -135 -10693 0

c  2+1 --> break 
c    (-b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧  p_135) -> break
c  in CNF:
c     b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 10688 -10689  10690 -135 1162 0


c  2-1 --> 1
c    (-b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧ -p_135) -> (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0)
c  in CNF:
c     b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_2
c     b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_1
c     b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨  b^{9, 16}_0
c  in DIMACS:
 10688 -10689  10690  135 -10691 0
 10688 -10689  10690  135 -10692 0
 10688 -10689  10690  135  10693 0

c  1-1 --> 0
c    (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0 ∧ -p_135) -> (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧ -b^{9, 16}_0)
c  in CNF:
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_2
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_1
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_0
c  in DIMACS:
 10688  10689 -10690  135 -10691 0
 10688  10689 -10690  135 -10692 0
 10688  10689 -10690  135 -10693 0

c  0-1 --> -1
c    (-b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧ -p_135) -> ( b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0)
c  in CNF:
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨  b^{9, 16}_2
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_1
c     b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨  b^{9, 16}_0
c  in DIMACS:
 10688  10689  10690  135  10691 0
 10688  10689  10690  135 -10692 0
 10688  10689  10690  135  10693 0

c  -1-1 --> -2
c    ( b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧  b^{9, 15}_0 ∧ -p_135) -> ( b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0)
c  in CNF:
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨  b^{9, 16}_2
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨  b^{9, 16}_1
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨  p_135 ∨ -b^{9, 16}_0
c  in DIMACS:
-10688  10689 -10690  135  10691 0
-10688  10689 -10690  135  10692 0
-10688  10689 -10690  135 -10693 0

c  -2-1 --> break 
c    ( b^{9, 15}_2 ∧  b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨  b^{9, 15}_0 ∨  p_135 ∨ break
c  in DIMACS:
-10688 -10689  10690  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 15}_2 ∧ -b^{9, 15}_1 ∧ -b^{9, 15}_0 ∧ true) 
c  in CNF:
c    -b^{9, 15}_2 ∨  b^{9, 15}_1 ∨  b^{9, 15}_0 ∨ false 
c  in DIMACS:
-10688  10689  10690  0

c  3 does not represent an automaton state.
c    -(-b^{9, 15}_2 ∧  b^{9, 15}_1 ∧  b^{9, 15}_0 ∧ true) 
c  in CNF:
c     b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ false 
c  in DIMACS:
 10688 -10689 -10690  0
c  -3 does not represent an automaton state.
c    -( b^{9, 15}_2 ∧  b^{9, 15}_1 ∧  b^{9, 15}_0 ∧ true) 
c  in CNF:
c    -b^{9, 15}_2 ∨ -b^{9, 15}_1 ∨ -b^{9, 15}_0 ∨ false 
c  in DIMACS:
-10688 -10689 -10690  0

c i = 16
c  -2+1 --> -1
c    ( b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧  p_144) -> ( b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0)
c  in CNF:
c    -b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨  b^{9, 17}_2
c    -b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_1
c    -b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨  b^{9, 17}_0
c  in DIMACS:
-10691 -10692  10693 -144  10694 0
-10691 -10692  10693 -144 -10695 0
-10691 -10692  10693 -144  10696 0

c  -1+1 --> 0
c    ( b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0 ∧  p_144) -> (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧ -b^{9, 17}_0)
c  in CNF:
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_2
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_1
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_0
c  in DIMACS:
-10691  10692 -10693 -144 -10694 0
-10691  10692 -10693 -144 -10695 0
-10691  10692 -10693 -144 -10696 0

c  0+1 --> 1
c    (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧  p_144) -> (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0)
c  in CNF:
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_2
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_1
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨  b^{9, 17}_0
c  in DIMACS:
 10691  10692  10693 -144 -10694 0
 10691  10692  10693 -144 -10695 0
 10691  10692  10693 -144  10696 0

c  1+1 --> 2
c    (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0 ∧  p_144) -> (-b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0)
c  in CNF:
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_2
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨  b^{9, 17}_1
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ -p_144 ∨ -b^{9, 17}_0
c  in DIMACS:
 10691  10692 -10693 -144 -10694 0
 10691  10692 -10693 -144  10695 0
 10691  10692 -10693 -144 -10696 0

c  2+1 --> break 
c    (-b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧  p_144) -> break
c  in CNF:
c     b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 10691 -10692  10693 -144 1162 0


c  2-1 --> 1
c    (-b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧ -p_144) -> (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0)
c  in CNF:
c     b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_2
c     b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_1
c     b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨  b^{9, 17}_0
c  in DIMACS:
 10691 -10692  10693  144 -10694 0
 10691 -10692  10693  144 -10695 0
 10691 -10692  10693  144  10696 0

c  1-1 --> 0
c    (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0 ∧ -p_144) -> (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧ -b^{9, 17}_0)
c  in CNF:
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_2
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_1
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_0
c  in DIMACS:
 10691  10692 -10693  144 -10694 0
 10691  10692 -10693  144 -10695 0
 10691  10692 -10693  144 -10696 0

c  0-1 --> -1
c    (-b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧ -p_144) -> ( b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0)
c  in CNF:
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨  b^{9, 17}_2
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_1
c     b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨  b^{9, 17}_0
c  in DIMACS:
 10691  10692  10693  144  10694 0
 10691  10692  10693  144 -10695 0
 10691  10692  10693  144  10696 0

c  -1-1 --> -2
c    ( b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧  b^{9, 16}_0 ∧ -p_144) -> ( b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0)
c  in CNF:
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨  b^{9, 17}_2
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨  b^{9, 17}_1
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨  p_144 ∨ -b^{9, 17}_0
c  in DIMACS:
-10691  10692 -10693  144  10694 0
-10691  10692 -10693  144  10695 0
-10691  10692 -10693  144 -10696 0

c  -2-1 --> break 
c    ( b^{9, 16}_2 ∧  b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨  b^{9, 16}_0 ∨  p_144 ∨ break
c  in DIMACS:
-10691 -10692  10693  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 16}_2 ∧ -b^{9, 16}_1 ∧ -b^{9, 16}_0 ∧ true) 
c  in CNF:
c    -b^{9, 16}_2 ∨  b^{9, 16}_1 ∨  b^{9, 16}_0 ∨ false 
c  in DIMACS:
-10691  10692  10693  0

c  3 does not represent an automaton state.
c    -(-b^{9, 16}_2 ∧  b^{9, 16}_1 ∧  b^{9, 16}_0 ∧ true) 
c  in CNF:
c     b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ false 
c  in DIMACS:
 10691 -10692 -10693  0
c  -3 does not represent an automaton state.
c    -( b^{9, 16}_2 ∧  b^{9, 16}_1 ∧  b^{9, 16}_0 ∧ true) 
c  in CNF:
c    -b^{9, 16}_2 ∨ -b^{9, 16}_1 ∨ -b^{9, 16}_0 ∨ false 
c  in DIMACS:
-10691 -10692 -10693  0

c i = 17
c  -2+1 --> -1
c    ( b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧  p_153) -> ( b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0)
c  in CNF:
c    -b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨  b^{9, 18}_2
c    -b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_1
c    -b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨  b^{9, 18}_0
c  in DIMACS:
-10694 -10695  10696 -153  10697 0
-10694 -10695  10696 -153 -10698 0
-10694 -10695  10696 -153  10699 0

c  -1+1 --> 0
c    ( b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0 ∧  p_153) -> (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧ -b^{9, 18}_0)
c  in CNF:
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_2
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_1
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_0
c  in DIMACS:
-10694  10695 -10696 -153 -10697 0
-10694  10695 -10696 -153 -10698 0
-10694  10695 -10696 -153 -10699 0

c  0+1 --> 1
c    (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧  p_153) -> (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0)
c  in CNF:
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_2
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_1
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨  b^{9, 18}_0
c  in DIMACS:
 10694  10695  10696 -153 -10697 0
 10694  10695  10696 -153 -10698 0
 10694  10695  10696 -153  10699 0

c  1+1 --> 2
c    (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0 ∧  p_153) -> (-b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0)
c  in CNF:
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_2
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨  b^{9, 18}_1
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ -p_153 ∨ -b^{9, 18}_0
c  in DIMACS:
 10694  10695 -10696 -153 -10697 0
 10694  10695 -10696 -153  10698 0
 10694  10695 -10696 -153 -10699 0

c  2+1 --> break 
c    (-b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧  p_153) -> break
c  in CNF:
c     b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 10694 -10695  10696 -153 1162 0


c  2-1 --> 1
c    (-b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧ -p_153) -> (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0)
c  in CNF:
c     b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_2
c     b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_1
c     b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨  b^{9, 18}_0
c  in DIMACS:
 10694 -10695  10696  153 -10697 0
 10694 -10695  10696  153 -10698 0
 10694 -10695  10696  153  10699 0

c  1-1 --> 0
c    (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0 ∧ -p_153) -> (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧ -b^{9, 18}_0)
c  in CNF:
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_2
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_1
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_0
c  in DIMACS:
 10694  10695 -10696  153 -10697 0
 10694  10695 -10696  153 -10698 0
 10694  10695 -10696  153 -10699 0

c  0-1 --> -1
c    (-b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧ -p_153) -> ( b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0)
c  in CNF:
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨  b^{9, 18}_2
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_1
c     b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨  b^{9, 18}_0
c  in DIMACS:
 10694  10695  10696  153  10697 0
 10694  10695  10696  153 -10698 0
 10694  10695  10696  153  10699 0

c  -1-1 --> -2
c    ( b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧  b^{9, 17}_0 ∧ -p_153) -> ( b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0)
c  in CNF:
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨  b^{9, 18}_2
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨  b^{9, 18}_1
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨  p_153 ∨ -b^{9, 18}_0
c  in DIMACS:
-10694  10695 -10696  153  10697 0
-10694  10695 -10696  153  10698 0
-10694  10695 -10696  153 -10699 0

c  -2-1 --> break 
c    ( b^{9, 17}_2 ∧  b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨  b^{9, 17}_0 ∨  p_153 ∨ break
c  in DIMACS:
-10694 -10695  10696  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 17}_2 ∧ -b^{9, 17}_1 ∧ -b^{9, 17}_0 ∧ true) 
c  in CNF:
c    -b^{9, 17}_2 ∨  b^{9, 17}_1 ∨  b^{9, 17}_0 ∨ false 
c  in DIMACS:
-10694  10695  10696  0

c  3 does not represent an automaton state.
c    -(-b^{9, 17}_2 ∧  b^{9, 17}_1 ∧  b^{9, 17}_0 ∧ true) 
c  in CNF:
c     b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ false 
c  in DIMACS:
 10694 -10695 -10696  0
c  -3 does not represent an automaton state.
c    -( b^{9, 17}_2 ∧  b^{9, 17}_1 ∧  b^{9, 17}_0 ∧ true) 
c  in CNF:
c    -b^{9, 17}_2 ∨ -b^{9, 17}_1 ∨ -b^{9, 17}_0 ∨ false 
c  in DIMACS:
-10694 -10695 -10696  0

c i = 18
c  -2+1 --> -1
c    ( b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧  p_162) -> ( b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0)
c  in CNF:
c    -b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨  b^{9, 19}_2
c    -b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_1
c    -b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨  b^{9, 19}_0
c  in DIMACS:
-10697 -10698  10699 -162  10700 0
-10697 -10698  10699 -162 -10701 0
-10697 -10698  10699 -162  10702 0

c  -1+1 --> 0
c    ( b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0 ∧  p_162) -> (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧ -b^{9, 19}_0)
c  in CNF:
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_2
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_1
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_0
c  in DIMACS:
-10697  10698 -10699 -162 -10700 0
-10697  10698 -10699 -162 -10701 0
-10697  10698 -10699 -162 -10702 0

c  0+1 --> 1
c    (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧  p_162) -> (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0)
c  in CNF:
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_2
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_1
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨  b^{9, 19}_0
c  in DIMACS:
 10697  10698  10699 -162 -10700 0
 10697  10698  10699 -162 -10701 0
 10697  10698  10699 -162  10702 0

c  1+1 --> 2
c    (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0 ∧  p_162) -> (-b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0)
c  in CNF:
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_2
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨  b^{9, 19}_1
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ -p_162 ∨ -b^{9, 19}_0
c  in DIMACS:
 10697  10698 -10699 -162 -10700 0
 10697  10698 -10699 -162  10701 0
 10697  10698 -10699 -162 -10702 0

c  2+1 --> break 
c    (-b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧  p_162) -> break
c  in CNF:
c     b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 10697 -10698  10699 -162 1162 0


c  2-1 --> 1
c    (-b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧ -p_162) -> (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0)
c  in CNF:
c     b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_2
c     b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_1
c     b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨  b^{9, 19}_0
c  in DIMACS:
 10697 -10698  10699  162 -10700 0
 10697 -10698  10699  162 -10701 0
 10697 -10698  10699  162  10702 0

c  1-1 --> 0
c    (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0 ∧ -p_162) -> (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧ -b^{9, 19}_0)
c  in CNF:
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_2
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_1
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_0
c  in DIMACS:
 10697  10698 -10699  162 -10700 0
 10697  10698 -10699  162 -10701 0
 10697  10698 -10699  162 -10702 0

c  0-1 --> -1
c    (-b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧ -p_162) -> ( b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0)
c  in CNF:
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨  b^{9, 19}_2
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_1
c     b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨  b^{9, 19}_0
c  in DIMACS:
 10697  10698  10699  162  10700 0
 10697  10698  10699  162 -10701 0
 10697  10698  10699  162  10702 0

c  -1-1 --> -2
c    ( b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧  b^{9, 18}_0 ∧ -p_162) -> ( b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0)
c  in CNF:
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨  b^{9, 19}_2
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨  b^{9, 19}_1
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨  p_162 ∨ -b^{9, 19}_0
c  in DIMACS:
-10697  10698 -10699  162  10700 0
-10697  10698 -10699  162  10701 0
-10697  10698 -10699  162 -10702 0

c  -2-1 --> break 
c    ( b^{9, 18}_2 ∧  b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨  b^{9, 18}_0 ∨  p_162 ∨ break
c  in DIMACS:
-10697 -10698  10699  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 18}_2 ∧ -b^{9, 18}_1 ∧ -b^{9, 18}_0 ∧ true) 
c  in CNF:
c    -b^{9, 18}_2 ∨  b^{9, 18}_1 ∨  b^{9, 18}_0 ∨ false 
c  in DIMACS:
-10697  10698  10699  0

c  3 does not represent an automaton state.
c    -(-b^{9, 18}_2 ∧  b^{9, 18}_1 ∧  b^{9, 18}_0 ∧ true) 
c  in CNF:
c     b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ false 
c  in DIMACS:
 10697 -10698 -10699  0
c  -3 does not represent an automaton state.
c    -( b^{9, 18}_2 ∧  b^{9, 18}_1 ∧  b^{9, 18}_0 ∧ true) 
c  in CNF:
c    -b^{9, 18}_2 ∨ -b^{9, 18}_1 ∨ -b^{9, 18}_0 ∨ false 
c  in DIMACS:
-10697 -10698 -10699  0

c i = 19
c  -2+1 --> -1
c    ( b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧  p_171) -> ( b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0)
c  in CNF:
c    -b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨  b^{9, 20}_2
c    -b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_1
c    -b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨  b^{9, 20}_0
c  in DIMACS:
-10700 -10701  10702 -171  10703 0
-10700 -10701  10702 -171 -10704 0
-10700 -10701  10702 -171  10705 0

c  -1+1 --> 0
c    ( b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0 ∧  p_171) -> (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧ -b^{9, 20}_0)
c  in CNF:
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_2
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_1
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_0
c  in DIMACS:
-10700  10701 -10702 -171 -10703 0
-10700  10701 -10702 -171 -10704 0
-10700  10701 -10702 -171 -10705 0

c  0+1 --> 1
c    (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧  p_171) -> (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0)
c  in CNF:
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_2
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_1
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨  b^{9, 20}_0
c  in DIMACS:
 10700  10701  10702 -171 -10703 0
 10700  10701  10702 -171 -10704 0
 10700  10701  10702 -171  10705 0

c  1+1 --> 2
c    (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0 ∧  p_171) -> (-b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0)
c  in CNF:
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_2
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨  b^{9, 20}_1
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ -p_171 ∨ -b^{9, 20}_0
c  in DIMACS:
 10700  10701 -10702 -171 -10703 0
 10700  10701 -10702 -171  10704 0
 10700  10701 -10702 -171 -10705 0

c  2+1 --> break 
c    (-b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧  p_171) -> break
c  in CNF:
c     b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 10700 -10701  10702 -171 1162 0


c  2-1 --> 1
c    (-b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧ -p_171) -> (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0)
c  in CNF:
c     b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_2
c     b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_1
c     b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨  b^{9, 20}_0
c  in DIMACS:
 10700 -10701  10702  171 -10703 0
 10700 -10701  10702  171 -10704 0
 10700 -10701  10702  171  10705 0

c  1-1 --> 0
c    (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0 ∧ -p_171) -> (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧ -b^{9, 20}_0)
c  in CNF:
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_2
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_1
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_0
c  in DIMACS:
 10700  10701 -10702  171 -10703 0
 10700  10701 -10702  171 -10704 0
 10700  10701 -10702  171 -10705 0

c  0-1 --> -1
c    (-b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧ -p_171) -> ( b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0)
c  in CNF:
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨  b^{9, 20}_2
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_1
c     b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨  b^{9, 20}_0
c  in DIMACS:
 10700  10701  10702  171  10703 0
 10700  10701  10702  171 -10704 0
 10700  10701  10702  171  10705 0

c  -1-1 --> -2
c    ( b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧  b^{9, 19}_0 ∧ -p_171) -> ( b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0)
c  in CNF:
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨  b^{9, 20}_2
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨  b^{9, 20}_1
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨  p_171 ∨ -b^{9, 20}_0
c  in DIMACS:
-10700  10701 -10702  171  10703 0
-10700  10701 -10702  171  10704 0
-10700  10701 -10702  171 -10705 0

c  -2-1 --> break 
c    ( b^{9, 19}_2 ∧  b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨  b^{9, 19}_0 ∨  p_171 ∨ break
c  in DIMACS:
-10700 -10701  10702  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 19}_2 ∧ -b^{9, 19}_1 ∧ -b^{9, 19}_0 ∧ true) 
c  in CNF:
c    -b^{9, 19}_2 ∨  b^{9, 19}_1 ∨  b^{9, 19}_0 ∨ false 
c  in DIMACS:
-10700  10701  10702  0

c  3 does not represent an automaton state.
c    -(-b^{9, 19}_2 ∧  b^{9, 19}_1 ∧  b^{9, 19}_0 ∧ true) 
c  in CNF:
c     b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ false 
c  in DIMACS:
 10700 -10701 -10702  0
c  -3 does not represent an automaton state.
c    -( b^{9, 19}_2 ∧  b^{9, 19}_1 ∧  b^{9, 19}_0 ∧ true) 
c  in CNF:
c    -b^{9, 19}_2 ∨ -b^{9, 19}_1 ∨ -b^{9, 19}_0 ∨ false 
c  in DIMACS:
-10700 -10701 -10702  0

c i = 20
c  -2+1 --> -1
c    ( b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧  p_180) -> ( b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0)
c  in CNF:
c    -b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨  b^{9, 21}_2
c    -b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_1
c    -b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨  b^{9, 21}_0
c  in DIMACS:
-10703 -10704  10705 -180  10706 0
-10703 -10704  10705 -180 -10707 0
-10703 -10704  10705 -180  10708 0

c  -1+1 --> 0
c    ( b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0 ∧  p_180) -> (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧ -b^{9, 21}_0)
c  in CNF:
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_2
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_1
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_0
c  in DIMACS:
-10703  10704 -10705 -180 -10706 0
-10703  10704 -10705 -180 -10707 0
-10703  10704 -10705 -180 -10708 0

c  0+1 --> 1
c    (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧  p_180) -> (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0)
c  in CNF:
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_2
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_1
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨  b^{9, 21}_0
c  in DIMACS:
 10703  10704  10705 -180 -10706 0
 10703  10704  10705 -180 -10707 0
 10703  10704  10705 -180  10708 0

c  1+1 --> 2
c    (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0 ∧  p_180) -> (-b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0)
c  in CNF:
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_2
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨  b^{9, 21}_1
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ -p_180 ∨ -b^{9, 21}_0
c  in DIMACS:
 10703  10704 -10705 -180 -10706 0
 10703  10704 -10705 -180  10707 0
 10703  10704 -10705 -180 -10708 0

c  2+1 --> break 
c    (-b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧  p_180) -> break
c  in CNF:
c     b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 10703 -10704  10705 -180 1162 0


c  2-1 --> 1
c    (-b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧ -p_180) -> (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0)
c  in CNF:
c     b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_2
c     b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_1
c     b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨  b^{9, 21}_0
c  in DIMACS:
 10703 -10704  10705  180 -10706 0
 10703 -10704  10705  180 -10707 0
 10703 -10704  10705  180  10708 0

c  1-1 --> 0
c    (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0 ∧ -p_180) -> (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧ -b^{9, 21}_0)
c  in CNF:
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_2
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_1
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_0
c  in DIMACS:
 10703  10704 -10705  180 -10706 0
 10703  10704 -10705  180 -10707 0
 10703  10704 -10705  180 -10708 0

c  0-1 --> -1
c    (-b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧ -p_180) -> ( b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0)
c  in CNF:
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨  b^{9, 21}_2
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_1
c     b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨  b^{9, 21}_0
c  in DIMACS:
 10703  10704  10705  180  10706 0
 10703  10704  10705  180 -10707 0
 10703  10704  10705  180  10708 0

c  -1-1 --> -2
c    ( b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧  b^{9, 20}_0 ∧ -p_180) -> ( b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0)
c  in CNF:
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨  b^{9, 21}_2
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨  b^{9, 21}_1
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨  p_180 ∨ -b^{9, 21}_0
c  in DIMACS:
-10703  10704 -10705  180  10706 0
-10703  10704 -10705  180  10707 0
-10703  10704 -10705  180 -10708 0

c  -2-1 --> break 
c    ( b^{9, 20}_2 ∧  b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨  b^{9, 20}_0 ∨  p_180 ∨ break
c  in DIMACS:
-10703 -10704  10705  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 20}_2 ∧ -b^{9, 20}_1 ∧ -b^{9, 20}_0 ∧ true) 
c  in CNF:
c    -b^{9, 20}_2 ∨  b^{9, 20}_1 ∨  b^{9, 20}_0 ∨ false 
c  in DIMACS:
-10703  10704  10705  0

c  3 does not represent an automaton state.
c    -(-b^{9, 20}_2 ∧  b^{9, 20}_1 ∧  b^{9, 20}_0 ∧ true) 
c  in CNF:
c     b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ false 
c  in DIMACS:
 10703 -10704 -10705  0
c  -3 does not represent an automaton state.
c    -( b^{9, 20}_2 ∧  b^{9, 20}_1 ∧  b^{9, 20}_0 ∧ true) 
c  in CNF:
c    -b^{9, 20}_2 ∨ -b^{9, 20}_1 ∨ -b^{9, 20}_0 ∨ false 
c  in DIMACS:
-10703 -10704 -10705  0

c i = 21
c  -2+1 --> -1
c    ( b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧  p_189) -> ( b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0)
c  in CNF:
c    -b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨  b^{9, 22}_2
c    -b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_1
c    -b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨  b^{9, 22}_0
c  in DIMACS:
-10706 -10707  10708 -189  10709 0
-10706 -10707  10708 -189 -10710 0
-10706 -10707  10708 -189  10711 0

c  -1+1 --> 0
c    ( b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0 ∧  p_189) -> (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧ -b^{9, 22}_0)
c  in CNF:
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_2
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_1
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_0
c  in DIMACS:
-10706  10707 -10708 -189 -10709 0
-10706  10707 -10708 -189 -10710 0
-10706  10707 -10708 -189 -10711 0

c  0+1 --> 1
c    (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧  p_189) -> (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0)
c  in CNF:
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_2
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_1
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨  b^{9, 22}_0
c  in DIMACS:
 10706  10707  10708 -189 -10709 0
 10706  10707  10708 -189 -10710 0
 10706  10707  10708 -189  10711 0

c  1+1 --> 2
c    (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0 ∧  p_189) -> (-b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0)
c  in CNF:
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_2
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨  b^{9, 22}_1
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ -p_189 ∨ -b^{9, 22}_0
c  in DIMACS:
 10706  10707 -10708 -189 -10709 0
 10706  10707 -10708 -189  10710 0
 10706  10707 -10708 -189 -10711 0

c  2+1 --> break 
c    (-b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧  p_189) -> break
c  in CNF:
c     b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 10706 -10707  10708 -189 1162 0


c  2-1 --> 1
c    (-b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧ -p_189) -> (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0)
c  in CNF:
c     b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_2
c     b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_1
c     b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨  b^{9, 22}_0
c  in DIMACS:
 10706 -10707  10708  189 -10709 0
 10706 -10707  10708  189 -10710 0
 10706 -10707  10708  189  10711 0

c  1-1 --> 0
c    (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0 ∧ -p_189) -> (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧ -b^{9, 22}_0)
c  in CNF:
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_2
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_1
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_0
c  in DIMACS:
 10706  10707 -10708  189 -10709 0
 10706  10707 -10708  189 -10710 0
 10706  10707 -10708  189 -10711 0

c  0-1 --> -1
c    (-b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧ -p_189) -> ( b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0)
c  in CNF:
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨  b^{9, 22}_2
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_1
c     b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨  b^{9, 22}_0
c  in DIMACS:
 10706  10707  10708  189  10709 0
 10706  10707  10708  189 -10710 0
 10706  10707  10708  189  10711 0

c  -1-1 --> -2
c    ( b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧  b^{9, 21}_0 ∧ -p_189) -> ( b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0)
c  in CNF:
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨  b^{9, 22}_2
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨  b^{9, 22}_1
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨  p_189 ∨ -b^{9, 22}_0
c  in DIMACS:
-10706  10707 -10708  189  10709 0
-10706  10707 -10708  189  10710 0
-10706  10707 -10708  189 -10711 0

c  -2-1 --> break 
c    ( b^{9, 21}_2 ∧  b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨  b^{9, 21}_0 ∨  p_189 ∨ break
c  in DIMACS:
-10706 -10707  10708  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 21}_2 ∧ -b^{9, 21}_1 ∧ -b^{9, 21}_0 ∧ true) 
c  in CNF:
c    -b^{9, 21}_2 ∨  b^{9, 21}_1 ∨  b^{9, 21}_0 ∨ false 
c  in DIMACS:
-10706  10707  10708  0

c  3 does not represent an automaton state.
c    -(-b^{9, 21}_2 ∧  b^{9, 21}_1 ∧  b^{9, 21}_0 ∧ true) 
c  in CNF:
c     b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ false 
c  in DIMACS:
 10706 -10707 -10708  0
c  -3 does not represent an automaton state.
c    -( b^{9, 21}_2 ∧  b^{9, 21}_1 ∧  b^{9, 21}_0 ∧ true) 
c  in CNF:
c    -b^{9, 21}_2 ∨ -b^{9, 21}_1 ∨ -b^{9, 21}_0 ∨ false 
c  in DIMACS:
-10706 -10707 -10708  0

c i = 22
c  -2+1 --> -1
c    ( b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧  p_198) -> ( b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0)
c  in CNF:
c    -b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨  b^{9, 23}_2
c    -b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_1
c    -b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨  b^{9, 23}_0
c  in DIMACS:
-10709 -10710  10711 -198  10712 0
-10709 -10710  10711 -198 -10713 0
-10709 -10710  10711 -198  10714 0

c  -1+1 --> 0
c    ( b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0 ∧  p_198) -> (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧ -b^{9, 23}_0)
c  in CNF:
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_2
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_1
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_0
c  in DIMACS:
-10709  10710 -10711 -198 -10712 0
-10709  10710 -10711 -198 -10713 0
-10709  10710 -10711 -198 -10714 0

c  0+1 --> 1
c    (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧  p_198) -> (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0)
c  in CNF:
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_2
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_1
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨  b^{9, 23}_0
c  in DIMACS:
 10709  10710  10711 -198 -10712 0
 10709  10710  10711 -198 -10713 0
 10709  10710  10711 -198  10714 0

c  1+1 --> 2
c    (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0 ∧  p_198) -> (-b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0)
c  in CNF:
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_2
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨  b^{9, 23}_1
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ -p_198 ∨ -b^{9, 23}_0
c  in DIMACS:
 10709  10710 -10711 -198 -10712 0
 10709  10710 -10711 -198  10713 0
 10709  10710 -10711 -198 -10714 0

c  2+1 --> break 
c    (-b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧  p_198) -> break
c  in CNF:
c     b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 10709 -10710  10711 -198 1162 0


c  2-1 --> 1
c    (-b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧ -p_198) -> (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0)
c  in CNF:
c     b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_2
c     b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_1
c     b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨  b^{9, 23}_0
c  in DIMACS:
 10709 -10710  10711  198 -10712 0
 10709 -10710  10711  198 -10713 0
 10709 -10710  10711  198  10714 0

c  1-1 --> 0
c    (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0 ∧ -p_198) -> (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧ -b^{9, 23}_0)
c  in CNF:
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_2
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_1
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_0
c  in DIMACS:
 10709  10710 -10711  198 -10712 0
 10709  10710 -10711  198 -10713 0
 10709  10710 -10711  198 -10714 0

c  0-1 --> -1
c    (-b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧ -p_198) -> ( b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0)
c  in CNF:
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨  b^{9, 23}_2
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_1
c     b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨  b^{9, 23}_0
c  in DIMACS:
 10709  10710  10711  198  10712 0
 10709  10710  10711  198 -10713 0
 10709  10710  10711  198  10714 0

c  -1-1 --> -2
c    ( b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧  b^{9, 22}_0 ∧ -p_198) -> ( b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0)
c  in CNF:
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨  b^{9, 23}_2
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨  b^{9, 23}_1
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨  p_198 ∨ -b^{9, 23}_0
c  in DIMACS:
-10709  10710 -10711  198  10712 0
-10709  10710 -10711  198  10713 0
-10709  10710 -10711  198 -10714 0

c  -2-1 --> break 
c    ( b^{9, 22}_2 ∧  b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨  b^{9, 22}_0 ∨  p_198 ∨ break
c  in DIMACS:
-10709 -10710  10711  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 22}_2 ∧ -b^{9, 22}_1 ∧ -b^{9, 22}_0 ∧ true) 
c  in CNF:
c    -b^{9, 22}_2 ∨  b^{9, 22}_1 ∨  b^{9, 22}_0 ∨ false 
c  in DIMACS:
-10709  10710  10711  0

c  3 does not represent an automaton state.
c    -(-b^{9, 22}_2 ∧  b^{9, 22}_1 ∧  b^{9, 22}_0 ∧ true) 
c  in CNF:
c     b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ false 
c  in DIMACS:
 10709 -10710 -10711  0
c  -3 does not represent an automaton state.
c    -( b^{9, 22}_2 ∧  b^{9, 22}_1 ∧  b^{9, 22}_0 ∧ true) 
c  in CNF:
c    -b^{9, 22}_2 ∨ -b^{9, 22}_1 ∨ -b^{9, 22}_0 ∨ false 
c  in DIMACS:
-10709 -10710 -10711  0

c i = 23
c  -2+1 --> -1
c    ( b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧  p_207) -> ( b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0)
c  in CNF:
c    -b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨  b^{9, 24}_2
c    -b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_1
c    -b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨  b^{9, 24}_0
c  in DIMACS:
-10712 -10713  10714 -207  10715 0
-10712 -10713  10714 -207 -10716 0
-10712 -10713  10714 -207  10717 0

c  -1+1 --> 0
c    ( b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0 ∧  p_207) -> (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧ -b^{9, 24}_0)
c  in CNF:
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_2
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_1
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_0
c  in DIMACS:
-10712  10713 -10714 -207 -10715 0
-10712  10713 -10714 -207 -10716 0
-10712  10713 -10714 -207 -10717 0

c  0+1 --> 1
c    (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧  p_207) -> (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0)
c  in CNF:
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_2
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_1
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨  b^{9, 24}_0
c  in DIMACS:
 10712  10713  10714 -207 -10715 0
 10712  10713  10714 -207 -10716 0
 10712  10713  10714 -207  10717 0

c  1+1 --> 2
c    (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0 ∧  p_207) -> (-b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0)
c  in CNF:
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_2
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨  b^{9, 24}_1
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ -p_207 ∨ -b^{9, 24}_0
c  in DIMACS:
 10712  10713 -10714 -207 -10715 0
 10712  10713 -10714 -207  10716 0
 10712  10713 -10714 -207 -10717 0

c  2+1 --> break 
c    (-b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧  p_207) -> break
c  in CNF:
c     b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 10712 -10713  10714 -207 1162 0


c  2-1 --> 1
c    (-b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧ -p_207) -> (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0)
c  in CNF:
c     b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_2
c     b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_1
c     b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨  b^{9, 24}_0
c  in DIMACS:
 10712 -10713  10714  207 -10715 0
 10712 -10713  10714  207 -10716 0
 10712 -10713  10714  207  10717 0

c  1-1 --> 0
c    (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0 ∧ -p_207) -> (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧ -b^{9, 24}_0)
c  in CNF:
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_2
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_1
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_0
c  in DIMACS:
 10712  10713 -10714  207 -10715 0
 10712  10713 -10714  207 -10716 0
 10712  10713 -10714  207 -10717 0

c  0-1 --> -1
c    (-b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧ -p_207) -> ( b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0)
c  in CNF:
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨  b^{9, 24}_2
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_1
c     b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨  b^{9, 24}_0
c  in DIMACS:
 10712  10713  10714  207  10715 0
 10712  10713  10714  207 -10716 0
 10712  10713  10714  207  10717 0

c  -1-1 --> -2
c    ( b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧  b^{9, 23}_0 ∧ -p_207) -> ( b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0)
c  in CNF:
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨  b^{9, 24}_2
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨  b^{9, 24}_1
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨  p_207 ∨ -b^{9, 24}_0
c  in DIMACS:
-10712  10713 -10714  207  10715 0
-10712  10713 -10714  207  10716 0
-10712  10713 -10714  207 -10717 0

c  -2-1 --> break 
c    ( b^{9, 23}_2 ∧  b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨  b^{9, 23}_0 ∨  p_207 ∨ break
c  in DIMACS:
-10712 -10713  10714  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 23}_2 ∧ -b^{9, 23}_1 ∧ -b^{9, 23}_0 ∧ true) 
c  in CNF:
c    -b^{9, 23}_2 ∨  b^{9, 23}_1 ∨  b^{9, 23}_0 ∨ false 
c  in DIMACS:
-10712  10713  10714  0

c  3 does not represent an automaton state.
c    -(-b^{9, 23}_2 ∧  b^{9, 23}_1 ∧  b^{9, 23}_0 ∧ true) 
c  in CNF:
c     b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ false 
c  in DIMACS:
 10712 -10713 -10714  0
c  -3 does not represent an automaton state.
c    -( b^{9, 23}_2 ∧  b^{9, 23}_1 ∧  b^{9, 23}_0 ∧ true) 
c  in CNF:
c    -b^{9, 23}_2 ∨ -b^{9, 23}_1 ∨ -b^{9, 23}_0 ∨ false 
c  in DIMACS:
-10712 -10713 -10714  0

c i = 24
c  -2+1 --> -1
c    ( b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧  p_216) -> ( b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0)
c  in CNF:
c    -b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨  b^{9, 25}_2
c    -b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_1
c    -b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨  b^{9, 25}_0
c  in DIMACS:
-10715 -10716  10717 -216  10718 0
-10715 -10716  10717 -216 -10719 0
-10715 -10716  10717 -216  10720 0

c  -1+1 --> 0
c    ( b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0 ∧  p_216) -> (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧ -b^{9, 25}_0)
c  in CNF:
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_2
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_1
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_0
c  in DIMACS:
-10715  10716 -10717 -216 -10718 0
-10715  10716 -10717 -216 -10719 0
-10715  10716 -10717 -216 -10720 0

c  0+1 --> 1
c    (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧  p_216) -> (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0)
c  in CNF:
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_2
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_1
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨  b^{9, 25}_0
c  in DIMACS:
 10715  10716  10717 -216 -10718 0
 10715  10716  10717 -216 -10719 0
 10715  10716  10717 -216  10720 0

c  1+1 --> 2
c    (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0 ∧  p_216) -> (-b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0)
c  in CNF:
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_2
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨  b^{9, 25}_1
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ -p_216 ∨ -b^{9, 25}_0
c  in DIMACS:
 10715  10716 -10717 -216 -10718 0
 10715  10716 -10717 -216  10719 0
 10715  10716 -10717 -216 -10720 0

c  2+1 --> break 
c    (-b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧  p_216) -> break
c  in CNF:
c     b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 10715 -10716  10717 -216 1162 0


c  2-1 --> 1
c    (-b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧ -p_216) -> (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0)
c  in CNF:
c     b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_2
c     b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_1
c     b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨  b^{9, 25}_0
c  in DIMACS:
 10715 -10716  10717  216 -10718 0
 10715 -10716  10717  216 -10719 0
 10715 -10716  10717  216  10720 0

c  1-1 --> 0
c    (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0 ∧ -p_216) -> (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧ -b^{9, 25}_0)
c  in CNF:
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_2
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_1
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_0
c  in DIMACS:
 10715  10716 -10717  216 -10718 0
 10715  10716 -10717  216 -10719 0
 10715  10716 -10717  216 -10720 0

c  0-1 --> -1
c    (-b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧ -p_216) -> ( b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0)
c  in CNF:
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨  b^{9, 25}_2
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_1
c     b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨  b^{9, 25}_0
c  in DIMACS:
 10715  10716  10717  216  10718 0
 10715  10716  10717  216 -10719 0
 10715  10716  10717  216  10720 0

c  -1-1 --> -2
c    ( b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧  b^{9, 24}_0 ∧ -p_216) -> ( b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0)
c  in CNF:
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨  b^{9, 25}_2
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨  b^{9, 25}_1
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨  p_216 ∨ -b^{9, 25}_0
c  in DIMACS:
-10715  10716 -10717  216  10718 0
-10715  10716 -10717  216  10719 0
-10715  10716 -10717  216 -10720 0

c  -2-1 --> break 
c    ( b^{9, 24}_2 ∧  b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨  b^{9, 24}_0 ∨  p_216 ∨ break
c  in DIMACS:
-10715 -10716  10717  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 24}_2 ∧ -b^{9, 24}_1 ∧ -b^{9, 24}_0 ∧ true) 
c  in CNF:
c    -b^{9, 24}_2 ∨  b^{9, 24}_1 ∨  b^{9, 24}_0 ∨ false 
c  in DIMACS:
-10715  10716  10717  0

c  3 does not represent an automaton state.
c    -(-b^{9, 24}_2 ∧  b^{9, 24}_1 ∧  b^{9, 24}_0 ∧ true) 
c  in CNF:
c     b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ false 
c  in DIMACS:
 10715 -10716 -10717  0
c  -3 does not represent an automaton state.
c    -( b^{9, 24}_2 ∧  b^{9, 24}_1 ∧  b^{9, 24}_0 ∧ true) 
c  in CNF:
c    -b^{9, 24}_2 ∨ -b^{9, 24}_1 ∨ -b^{9, 24}_0 ∨ false 
c  in DIMACS:
-10715 -10716 -10717  0

c i = 25
c  -2+1 --> -1
c    ( b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧  p_225) -> ( b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0)
c  in CNF:
c    -b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨  b^{9, 26}_2
c    -b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_1
c    -b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨  b^{9, 26}_0
c  in DIMACS:
-10718 -10719  10720 -225  10721 0
-10718 -10719  10720 -225 -10722 0
-10718 -10719  10720 -225  10723 0

c  -1+1 --> 0
c    ( b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0 ∧  p_225) -> (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧ -b^{9, 26}_0)
c  in CNF:
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_2
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_1
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_0
c  in DIMACS:
-10718  10719 -10720 -225 -10721 0
-10718  10719 -10720 -225 -10722 0
-10718  10719 -10720 -225 -10723 0

c  0+1 --> 1
c    (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧  p_225) -> (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0)
c  in CNF:
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_2
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_1
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨  b^{9, 26}_0
c  in DIMACS:
 10718  10719  10720 -225 -10721 0
 10718  10719  10720 -225 -10722 0
 10718  10719  10720 -225  10723 0

c  1+1 --> 2
c    (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0 ∧  p_225) -> (-b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0)
c  in CNF:
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_2
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨  b^{9, 26}_1
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ -p_225 ∨ -b^{9, 26}_0
c  in DIMACS:
 10718  10719 -10720 -225 -10721 0
 10718  10719 -10720 -225  10722 0
 10718  10719 -10720 -225 -10723 0

c  2+1 --> break 
c    (-b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧  p_225) -> break
c  in CNF:
c     b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 10718 -10719  10720 -225 1162 0


c  2-1 --> 1
c    (-b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧ -p_225) -> (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0)
c  in CNF:
c     b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_2
c     b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_1
c     b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨  b^{9, 26}_0
c  in DIMACS:
 10718 -10719  10720  225 -10721 0
 10718 -10719  10720  225 -10722 0
 10718 -10719  10720  225  10723 0

c  1-1 --> 0
c    (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0 ∧ -p_225) -> (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧ -b^{9, 26}_0)
c  in CNF:
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_2
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_1
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_0
c  in DIMACS:
 10718  10719 -10720  225 -10721 0
 10718  10719 -10720  225 -10722 0
 10718  10719 -10720  225 -10723 0

c  0-1 --> -1
c    (-b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧ -p_225) -> ( b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0)
c  in CNF:
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨  b^{9, 26}_2
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_1
c     b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨  b^{9, 26}_0
c  in DIMACS:
 10718  10719  10720  225  10721 0
 10718  10719  10720  225 -10722 0
 10718  10719  10720  225  10723 0

c  -1-1 --> -2
c    ( b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧  b^{9, 25}_0 ∧ -p_225) -> ( b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0)
c  in CNF:
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨  b^{9, 26}_2
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨  b^{9, 26}_1
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨  p_225 ∨ -b^{9, 26}_0
c  in DIMACS:
-10718  10719 -10720  225  10721 0
-10718  10719 -10720  225  10722 0
-10718  10719 -10720  225 -10723 0

c  -2-1 --> break 
c    ( b^{9, 25}_2 ∧  b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨  b^{9, 25}_0 ∨  p_225 ∨ break
c  in DIMACS:
-10718 -10719  10720  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 25}_2 ∧ -b^{9, 25}_1 ∧ -b^{9, 25}_0 ∧ true) 
c  in CNF:
c    -b^{9, 25}_2 ∨  b^{9, 25}_1 ∨  b^{9, 25}_0 ∨ false 
c  in DIMACS:
-10718  10719  10720  0

c  3 does not represent an automaton state.
c    -(-b^{9, 25}_2 ∧  b^{9, 25}_1 ∧  b^{9, 25}_0 ∧ true) 
c  in CNF:
c     b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ false 
c  in DIMACS:
 10718 -10719 -10720  0
c  -3 does not represent an automaton state.
c    -( b^{9, 25}_2 ∧  b^{9, 25}_1 ∧  b^{9, 25}_0 ∧ true) 
c  in CNF:
c    -b^{9, 25}_2 ∨ -b^{9, 25}_1 ∨ -b^{9, 25}_0 ∨ false 
c  in DIMACS:
-10718 -10719 -10720  0

c i = 26
c  -2+1 --> -1
c    ( b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧  p_234) -> ( b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0)
c  in CNF:
c    -b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨  b^{9, 27}_2
c    -b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_1
c    -b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨  b^{9, 27}_0
c  in DIMACS:
-10721 -10722  10723 -234  10724 0
-10721 -10722  10723 -234 -10725 0
-10721 -10722  10723 -234  10726 0

c  -1+1 --> 0
c    ( b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0 ∧  p_234) -> (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧ -b^{9, 27}_0)
c  in CNF:
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_2
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_1
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_0
c  in DIMACS:
-10721  10722 -10723 -234 -10724 0
-10721  10722 -10723 -234 -10725 0
-10721  10722 -10723 -234 -10726 0

c  0+1 --> 1
c    (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧  p_234) -> (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0)
c  in CNF:
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_2
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_1
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨  b^{9, 27}_0
c  in DIMACS:
 10721  10722  10723 -234 -10724 0
 10721  10722  10723 -234 -10725 0
 10721  10722  10723 -234  10726 0

c  1+1 --> 2
c    (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0 ∧  p_234) -> (-b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0)
c  in CNF:
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_2
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨  b^{9, 27}_1
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ -p_234 ∨ -b^{9, 27}_0
c  in DIMACS:
 10721  10722 -10723 -234 -10724 0
 10721  10722 -10723 -234  10725 0
 10721  10722 -10723 -234 -10726 0

c  2+1 --> break 
c    (-b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧  p_234) -> break
c  in CNF:
c     b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 10721 -10722  10723 -234 1162 0


c  2-1 --> 1
c    (-b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧ -p_234) -> (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0)
c  in CNF:
c     b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_2
c     b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_1
c     b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨  b^{9, 27}_0
c  in DIMACS:
 10721 -10722  10723  234 -10724 0
 10721 -10722  10723  234 -10725 0
 10721 -10722  10723  234  10726 0

c  1-1 --> 0
c    (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0 ∧ -p_234) -> (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧ -b^{9, 27}_0)
c  in CNF:
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_2
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_1
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_0
c  in DIMACS:
 10721  10722 -10723  234 -10724 0
 10721  10722 -10723  234 -10725 0
 10721  10722 -10723  234 -10726 0

c  0-1 --> -1
c    (-b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧ -p_234) -> ( b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0)
c  in CNF:
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨  b^{9, 27}_2
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_1
c     b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨  b^{9, 27}_0
c  in DIMACS:
 10721  10722  10723  234  10724 0
 10721  10722  10723  234 -10725 0
 10721  10722  10723  234  10726 0

c  -1-1 --> -2
c    ( b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧  b^{9, 26}_0 ∧ -p_234) -> ( b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0)
c  in CNF:
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨  b^{9, 27}_2
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨  b^{9, 27}_1
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨  p_234 ∨ -b^{9, 27}_0
c  in DIMACS:
-10721  10722 -10723  234  10724 0
-10721  10722 -10723  234  10725 0
-10721  10722 -10723  234 -10726 0

c  -2-1 --> break 
c    ( b^{9, 26}_2 ∧  b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨  b^{9, 26}_0 ∨  p_234 ∨ break
c  in DIMACS:
-10721 -10722  10723  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 26}_2 ∧ -b^{9, 26}_1 ∧ -b^{9, 26}_0 ∧ true) 
c  in CNF:
c    -b^{9, 26}_2 ∨  b^{9, 26}_1 ∨  b^{9, 26}_0 ∨ false 
c  in DIMACS:
-10721  10722  10723  0

c  3 does not represent an automaton state.
c    -(-b^{9, 26}_2 ∧  b^{9, 26}_1 ∧  b^{9, 26}_0 ∧ true) 
c  in CNF:
c     b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ false 
c  in DIMACS:
 10721 -10722 -10723  0
c  -3 does not represent an automaton state.
c    -( b^{9, 26}_2 ∧  b^{9, 26}_1 ∧  b^{9, 26}_0 ∧ true) 
c  in CNF:
c    -b^{9, 26}_2 ∨ -b^{9, 26}_1 ∨ -b^{9, 26}_0 ∨ false 
c  in DIMACS:
-10721 -10722 -10723  0

c i = 27
c  -2+1 --> -1
c    ( b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧  p_243) -> ( b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0)
c  in CNF:
c    -b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨  b^{9, 28}_2
c    -b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_1
c    -b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨  b^{9, 28}_0
c  in DIMACS:
-10724 -10725  10726 -243  10727 0
-10724 -10725  10726 -243 -10728 0
-10724 -10725  10726 -243  10729 0

c  -1+1 --> 0
c    ( b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0 ∧  p_243) -> (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧ -b^{9, 28}_0)
c  in CNF:
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_2
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_1
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_0
c  in DIMACS:
-10724  10725 -10726 -243 -10727 0
-10724  10725 -10726 -243 -10728 0
-10724  10725 -10726 -243 -10729 0

c  0+1 --> 1
c    (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧  p_243) -> (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0)
c  in CNF:
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_2
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_1
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨  b^{9, 28}_0
c  in DIMACS:
 10724  10725  10726 -243 -10727 0
 10724  10725  10726 -243 -10728 0
 10724  10725  10726 -243  10729 0

c  1+1 --> 2
c    (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0 ∧  p_243) -> (-b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0)
c  in CNF:
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_2
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨  b^{9, 28}_1
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ -p_243 ∨ -b^{9, 28}_0
c  in DIMACS:
 10724  10725 -10726 -243 -10727 0
 10724  10725 -10726 -243  10728 0
 10724  10725 -10726 -243 -10729 0

c  2+1 --> break 
c    (-b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧  p_243) -> break
c  in CNF:
c     b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 10724 -10725  10726 -243 1162 0


c  2-1 --> 1
c    (-b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧ -p_243) -> (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0)
c  in CNF:
c     b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_2
c     b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_1
c     b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨  b^{9, 28}_0
c  in DIMACS:
 10724 -10725  10726  243 -10727 0
 10724 -10725  10726  243 -10728 0
 10724 -10725  10726  243  10729 0

c  1-1 --> 0
c    (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0 ∧ -p_243) -> (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧ -b^{9, 28}_0)
c  in CNF:
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_2
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_1
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_0
c  in DIMACS:
 10724  10725 -10726  243 -10727 0
 10724  10725 -10726  243 -10728 0
 10724  10725 -10726  243 -10729 0

c  0-1 --> -1
c    (-b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧ -p_243) -> ( b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0)
c  in CNF:
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨  b^{9, 28}_2
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_1
c     b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨  b^{9, 28}_0
c  in DIMACS:
 10724  10725  10726  243  10727 0
 10724  10725  10726  243 -10728 0
 10724  10725  10726  243  10729 0

c  -1-1 --> -2
c    ( b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧  b^{9, 27}_0 ∧ -p_243) -> ( b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0)
c  in CNF:
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨  b^{9, 28}_2
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨  b^{9, 28}_1
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨  p_243 ∨ -b^{9, 28}_0
c  in DIMACS:
-10724  10725 -10726  243  10727 0
-10724  10725 -10726  243  10728 0
-10724  10725 -10726  243 -10729 0

c  -2-1 --> break 
c    ( b^{9, 27}_2 ∧  b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨  b^{9, 27}_0 ∨  p_243 ∨ break
c  in DIMACS:
-10724 -10725  10726  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 27}_2 ∧ -b^{9, 27}_1 ∧ -b^{9, 27}_0 ∧ true) 
c  in CNF:
c    -b^{9, 27}_2 ∨  b^{9, 27}_1 ∨  b^{9, 27}_0 ∨ false 
c  in DIMACS:
-10724  10725  10726  0

c  3 does not represent an automaton state.
c    -(-b^{9, 27}_2 ∧  b^{9, 27}_1 ∧  b^{9, 27}_0 ∧ true) 
c  in CNF:
c     b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ false 
c  in DIMACS:
 10724 -10725 -10726  0
c  -3 does not represent an automaton state.
c    -( b^{9, 27}_2 ∧  b^{9, 27}_1 ∧  b^{9, 27}_0 ∧ true) 
c  in CNF:
c    -b^{9, 27}_2 ∨ -b^{9, 27}_1 ∨ -b^{9, 27}_0 ∨ false 
c  in DIMACS:
-10724 -10725 -10726  0

c i = 28
c  -2+1 --> -1
c    ( b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧  p_252) -> ( b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0)
c  in CNF:
c    -b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨  b^{9, 29}_2
c    -b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_1
c    -b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨  b^{9, 29}_0
c  in DIMACS:
-10727 -10728  10729 -252  10730 0
-10727 -10728  10729 -252 -10731 0
-10727 -10728  10729 -252  10732 0

c  -1+1 --> 0
c    ( b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0 ∧  p_252) -> (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧ -b^{9, 29}_0)
c  in CNF:
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_2
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_1
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_0
c  in DIMACS:
-10727  10728 -10729 -252 -10730 0
-10727  10728 -10729 -252 -10731 0
-10727  10728 -10729 -252 -10732 0

c  0+1 --> 1
c    (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧  p_252) -> (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0)
c  in CNF:
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_2
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_1
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨  b^{9, 29}_0
c  in DIMACS:
 10727  10728  10729 -252 -10730 0
 10727  10728  10729 -252 -10731 0
 10727  10728  10729 -252  10732 0

c  1+1 --> 2
c    (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0 ∧  p_252) -> (-b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0)
c  in CNF:
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_2
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨  b^{9, 29}_1
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ -p_252 ∨ -b^{9, 29}_0
c  in DIMACS:
 10727  10728 -10729 -252 -10730 0
 10727  10728 -10729 -252  10731 0
 10727  10728 -10729 -252 -10732 0

c  2+1 --> break 
c    (-b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧  p_252) -> break
c  in CNF:
c     b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 10727 -10728  10729 -252 1162 0


c  2-1 --> 1
c    (-b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧ -p_252) -> (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0)
c  in CNF:
c     b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_2
c     b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_1
c     b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨  b^{9, 29}_0
c  in DIMACS:
 10727 -10728  10729  252 -10730 0
 10727 -10728  10729  252 -10731 0
 10727 -10728  10729  252  10732 0

c  1-1 --> 0
c    (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0 ∧ -p_252) -> (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧ -b^{9, 29}_0)
c  in CNF:
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_2
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_1
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_0
c  in DIMACS:
 10727  10728 -10729  252 -10730 0
 10727  10728 -10729  252 -10731 0
 10727  10728 -10729  252 -10732 0

c  0-1 --> -1
c    (-b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧ -p_252) -> ( b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0)
c  in CNF:
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨  b^{9, 29}_2
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_1
c     b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨  b^{9, 29}_0
c  in DIMACS:
 10727  10728  10729  252  10730 0
 10727  10728  10729  252 -10731 0
 10727  10728  10729  252  10732 0

c  -1-1 --> -2
c    ( b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧  b^{9, 28}_0 ∧ -p_252) -> ( b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0)
c  in CNF:
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨  b^{9, 29}_2
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨  b^{9, 29}_1
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨  p_252 ∨ -b^{9, 29}_0
c  in DIMACS:
-10727  10728 -10729  252  10730 0
-10727  10728 -10729  252  10731 0
-10727  10728 -10729  252 -10732 0

c  -2-1 --> break 
c    ( b^{9, 28}_2 ∧  b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨  b^{9, 28}_0 ∨  p_252 ∨ break
c  in DIMACS:
-10727 -10728  10729  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 28}_2 ∧ -b^{9, 28}_1 ∧ -b^{9, 28}_0 ∧ true) 
c  in CNF:
c    -b^{9, 28}_2 ∨  b^{9, 28}_1 ∨  b^{9, 28}_0 ∨ false 
c  in DIMACS:
-10727  10728  10729  0

c  3 does not represent an automaton state.
c    -(-b^{9, 28}_2 ∧  b^{9, 28}_1 ∧  b^{9, 28}_0 ∧ true) 
c  in CNF:
c     b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ false 
c  in DIMACS:
 10727 -10728 -10729  0
c  -3 does not represent an automaton state.
c    -( b^{9, 28}_2 ∧  b^{9, 28}_1 ∧  b^{9, 28}_0 ∧ true) 
c  in CNF:
c    -b^{9, 28}_2 ∨ -b^{9, 28}_1 ∨ -b^{9, 28}_0 ∨ false 
c  in DIMACS:
-10727 -10728 -10729  0

c i = 29
c  -2+1 --> -1
c    ( b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧  p_261) -> ( b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0)
c  in CNF:
c    -b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨  b^{9, 30}_2
c    -b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_1
c    -b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨  b^{9, 30}_0
c  in DIMACS:
-10730 -10731  10732 -261  10733 0
-10730 -10731  10732 -261 -10734 0
-10730 -10731  10732 -261  10735 0

c  -1+1 --> 0
c    ( b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0 ∧  p_261) -> (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧ -b^{9, 30}_0)
c  in CNF:
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_2
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_1
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_0
c  in DIMACS:
-10730  10731 -10732 -261 -10733 0
-10730  10731 -10732 -261 -10734 0
-10730  10731 -10732 -261 -10735 0

c  0+1 --> 1
c    (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧  p_261) -> (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0)
c  in CNF:
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_2
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_1
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨  b^{9, 30}_0
c  in DIMACS:
 10730  10731  10732 -261 -10733 0
 10730  10731  10732 -261 -10734 0
 10730  10731  10732 -261  10735 0

c  1+1 --> 2
c    (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0 ∧  p_261) -> (-b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0)
c  in CNF:
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_2
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨  b^{9, 30}_1
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ -p_261 ∨ -b^{9, 30}_0
c  in DIMACS:
 10730  10731 -10732 -261 -10733 0
 10730  10731 -10732 -261  10734 0
 10730  10731 -10732 -261 -10735 0

c  2+1 --> break 
c    (-b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧  p_261) -> break
c  in CNF:
c     b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 10730 -10731  10732 -261 1162 0


c  2-1 --> 1
c    (-b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧ -p_261) -> (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0)
c  in CNF:
c     b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_2
c     b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_1
c     b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨  b^{9, 30}_0
c  in DIMACS:
 10730 -10731  10732  261 -10733 0
 10730 -10731  10732  261 -10734 0
 10730 -10731  10732  261  10735 0

c  1-1 --> 0
c    (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0 ∧ -p_261) -> (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧ -b^{9, 30}_0)
c  in CNF:
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_2
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_1
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_0
c  in DIMACS:
 10730  10731 -10732  261 -10733 0
 10730  10731 -10732  261 -10734 0
 10730  10731 -10732  261 -10735 0

c  0-1 --> -1
c    (-b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧ -p_261) -> ( b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0)
c  in CNF:
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨  b^{9, 30}_2
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_1
c     b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨  b^{9, 30}_0
c  in DIMACS:
 10730  10731  10732  261  10733 0
 10730  10731  10732  261 -10734 0
 10730  10731  10732  261  10735 0

c  -1-1 --> -2
c    ( b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧  b^{9, 29}_0 ∧ -p_261) -> ( b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0)
c  in CNF:
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨  b^{9, 30}_2
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨  b^{9, 30}_1
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨  p_261 ∨ -b^{9, 30}_0
c  in DIMACS:
-10730  10731 -10732  261  10733 0
-10730  10731 -10732  261  10734 0
-10730  10731 -10732  261 -10735 0

c  -2-1 --> break 
c    ( b^{9, 29}_2 ∧  b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨  b^{9, 29}_0 ∨  p_261 ∨ break
c  in DIMACS:
-10730 -10731  10732  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 29}_2 ∧ -b^{9, 29}_1 ∧ -b^{9, 29}_0 ∧ true) 
c  in CNF:
c    -b^{9, 29}_2 ∨  b^{9, 29}_1 ∨  b^{9, 29}_0 ∨ false 
c  in DIMACS:
-10730  10731  10732  0

c  3 does not represent an automaton state.
c    -(-b^{9, 29}_2 ∧  b^{9, 29}_1 ∧  b^{9, 29}_0 ∧ true) 
c  in CNF:
c     b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ false 
c  in DIMACS:
 10730 -10731 -10732  0
c  -3 does not represent an automaton state.
c    -( b^{9, 29}_2 ∧  b^{9, 29}_1 ∧  b^{9, 29}_0 ∧ true) 
c  in CNF:
c    -b^{9, 29}_2 ∨ -b^{9, 29}_1 ∨ -b^{9, 29}_0 ∨ false 
c  in DIMACS:
-10730 -10731 -10732  0

c i = 30
c  -2+1 --> -1
c    ( b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧  p_270) -> ( b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0)
c  in CNF:
c    -b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨  b^{9, 31}_2
c    -b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_1
c    -b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨  b^{9, 31}_0
c  in DIMACS:
-10733 -10734  10735 -270  10736 0
-10733 -10734  10735 -270 -10737 0
-10733 -10734  10735 -270  10738 0

c  -1+1 --> 0
c    ( b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0 ∧  p_270) -> (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧ -b^{9, 31}_0)
c  in CNF:
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_2
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_1
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_0
c  in DIMACS:
-10733  10734 -10735 -270 -10736 0
-10733  10734 -10735 -270 -10737 0
-10733  10734 -10735 -270 -10738 0

c  0+1 --> 1
c    (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧  p_270) -> (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0)
c  in CNF:
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_2
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_1
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨  b^{9, 31}_0
c  in DIMACS:
 10733  10734  10735 -270 -10736 0
 10733  10734  10735 -270 -10737 0
 10733  10734  10735 -270  10738 0

c  1+1 --> 2
c    (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0 ∧  p_270) -> (-b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0)
c  in CNF:
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_2
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨  b^{9, 31}_1
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ -p_270 ∨ -b^{9, 31}_0
c  in DIMACS:
 10733  10734 -10735 -270 -10736 0
 10733  10734 -10735 -270  10737 0
 10733  10734 -10735 -270 -10738 0

c  2+1 --> break 
c    (-b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧  p_270) -> break
c  in CNF:
c     b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 10733 -10734  10735 -270 1162 0


c  2-1 --> 1
c    (-b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧ -p_270) -> (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0)
c  in CNF:
c     b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_2
c     b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_1
c     b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨  b^{9, 31}_0
c  in DIMACS:
 10733 -10734  10735  270 -10736 0
 10733 -10734  10735  270 -10737 0
 10733 -10734  10735  270  10738 0

c  1-1 --> 0
c    (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0 ∧ -p_270) -> (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧ -b^{9, 31}_0)
c  in CNF:
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_2
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_1
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_0
c  in DIMACS:
 10733  10734 -10735  270 -10736 0
 10733  10734 -10735  270 -10737 0
 10733  10734 -10735  270 -10738 0

c  0-1 --> -1
c    (-b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧ -p_270) -> ( b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0)
c  in CNF:
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨  b^{9, 31}_2
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_1
c     b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨  b^{9, 31}_0
c  in DIMACS:
 10733  10734  10735  270  10736 0
 10733  10734  10735  270 -10737 0
 10733  10734  10735  270  10738 0

c  -1-1 --> -2
c    ( b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧  b^{9, 30}_0 ∧ -p_270) -> ( b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0)
c  in CNF:
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨  b^{9, 31}_2
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨  b^{9, 31}_1
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨  p_270 ∨ -b^{9, 31}_0
c  in DIMACS:
-10733  10734 -10735  270  10736 0
-10733  10734 -10735  270  10737 0
-10733  10734 -10735  270 -10738 0

c  -2-1 --> break 
c    ( b^{9, 30}_2 ∧  b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨  b^{9, 30}_0 ∨  p_270 ∨ break
c  in DIMACS:
-10733 -10734  10735  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 30}_2 ∧ -b^{9, 30}_1 ∧ -b^{9, 30}_0 ∧ true) 
c  in CNF:
c    -b^{9, 30}_2 ∨  b^{9, 30}_1 ∨  b^{9, 30}_0 ∨ false 
c  in DIMACS:
-10733  10734  10735  0

c  3 does not represent an automaton state.
c    -(-b^{9, 30}_2 ∧  b^{9, 30}_1 ∧  b^{9, 30}_0 ∧ true) 
c  in CNF:
c     b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ false 
c  in DIMACS:
 10733 -10734 -10735  0
c  -3 does not represent an automaton state.
c    -( b^{9, 30}_2 ∧  b^{9, 30}_1 ∧  b^{9, 30}_0 ∧ true) 
c  in CNF:
c    -b^{9, 30}_2 ∨ -b^{9, 30}_1 ∨ -b^{9, 30}_0 ∨ false 
c  in DIMACS:
-10733 -10734 -10735  0

c i = 31
c  -2+1 --> -1
c    ( b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧  p_279) -> ( b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0)
c  in CNF:
c    -b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨  b^{9, 32}_2
c    -b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_1
c    -b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨  b^{9, 32}_0
c  in DIMACS:
-10736 -10737  10738 -279  10739 0
-10736 -10737  10738 -279 -10740 0
-10736 -10737  10738 -279  10741 0

c  -1+1 --> 0
c    ( b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0 ∧  p_279) -> (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧ -b^{9, 32}_0)
c  in CNF:
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_2
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_1
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_0
c  in DIMACS:
-10736  10737 -10738 -279 -10739 0
-10736  10737 -10738 -279 -10740 0
-10736  10737 -10738 -279 -10741 0

c  0+1 --> 1
c    (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧  p_279) -> (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0)
c  in CNF:
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_2
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_1
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨  b^{9, 32}_0
c  in DIMACS:
 10736  10737  10738 -279 -10739 0
 10736  10737  10738 -279 -10740 0
 10736  10737  10738 -279  10741 0

c  1+1 --> 2
c    (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0 ∧  p_279) -> (-b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0)
c  in CNF:
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_2
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨  b^{9, 32}_1
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ -p_279 ∨ -b^{9, 32}_0
c  in DIMACS:
 10736  10737 -10738 -279 -10739 0
 10736  10737 -10738 -279  10740 0
 10736  10737 -10738 -279 -10741 0

c  2+1 --> break 
c    (-b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧  p_279) -> break
c  in CNF:
c     b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 10736 -10737  10738 -279 1162 0


c  2-1 --> 1
c    (-b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧ -p_279) -> (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0)
c  in CNF:
c     b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_2
c     b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_1
c     b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨  b^{9, 32}_0
c  in DIMACS:
 10736 -10737  10738  279 -10739 0
 10736 -10737  10738  279 -10740 0
 10736 -10737  10738  279  10741 0

c  1-1 --> 0
c    (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0 ∧ -p_279) -> (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧ -b^{9, 32}_0)
c  in CNF:
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_2
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_1
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_0
c  in DIMACS:
 10736  10737 -10738  279 -10739 0
 10736  10737 -10738  279 -10740 0
 10736  10737 -10738  279 -10741 0

c  0-1 --> -1
c    (-b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧ -p_279) -> ( b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0)
c  in CNF:
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨  b^{9, 32}_2
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_1
c     b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨  b^{9, 32}_0
c  in DIMACS:
 10736  10737  10738  279  10739 0
 10736  10737  10738  279 -10740 0
 10736  10737  10738  279  10741 0

c  -1-1 --> -2
c    ( b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧  b^{9, 31}_0 ∧ -p_279) -> ( b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0)
c  in CNF:
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨  b^{9, 32}_2
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨  b^{9, 32}_1
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨  p_279 ∨ -b^{9, 32}_0
c  in DIMACS:
-10736  10737 -10738  279  10739 0
-10736  10737 -10738  279  10740 0
-10736  10737 -10738  279 -10741 0

c  -2-1 --> break 
c    ( b^{9, 31}_2 ∧  b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨  b^{9, 31}_0 ∨  p_279 ∨ break
c  in DIMACS:
-10736 -10737  10738  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 31}_2 ∧ -b^{9, 31}_1 ∧ -b^{9, 31}_0 ∧ true) 
c  in CNF:
c    -b^{9, 31}_2 ∨  b^{9, 31}_1 ∨  b^{9, 31}_0 ∨ false 
c  in DIMACS:
-10736  10737  10738  0

c  3 does not represent an automaton state.
c    -(-b^{9, 31}_2 ∧  b^{9, 31}_1 ∧  b^{9, 31}_0 ∧ true) 
c  in CNF:
c     b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ false 
c  in DIMACS:
 10736 -10737 -10738  0
c  -3 does not represent an automaton state.
c    -( b^{9, 31}_2 ∧  b^{9, 31}_1 ∧  b^{9, 31}_0 ∧ true) 
c  in CNF:
c    -b^{9, 31}_2 ∨ -b^{9, 31}_1 ∨ -b^{9, 31}_0 ∨ false 
c  in DIMACS:
-10736 -10737 -10738  0

c i = 32
c  -2+1 --> -1
c    ( b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧  p_288) -> ( b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0)
c  in CNF:
c    -b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨  b^{9, 33}_2
c    -b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_1
c    -b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨  b^{9, 33}_0
c  in DIMACS:
-10739 -10740  10741 -288  10742 0
-10739 -10740  10741 -288 -10743 0
-10739 -10740  10741 -288  10744 0

c  -1+1 --> 0
c    ( b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0 ∧  p_288) -> (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧ -b^{9, 33}_0)
c  in CNF:
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_2
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_1
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_0
c  in DIMACS:
-10739  10740 -10741 -288 -10742 0
-10739  10740 -10741 -288 -10743 0
-10739  10740 -10741 -288 -10744 0

c  0+1 --> 1
c    (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧  p_288) -> (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0)
c  in CNF:
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_2
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_1
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨  b^{9, 33}_0
c  in DIMACS:
 10739  10740  10741 -288 -10742 0
 10739  10740  10741 -288 -10743 0
 10739  10740  10741 -288  10744 0

c  1+1 --> 2
c    (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0 ∧  p_288) -> (-b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0)
c  in CNF:
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_2
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨  b^{9, 33}_1
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ -p_288 ∨ -b^{9, 33}_0
c  in DIMACS:
 10739  10740 -10741 -288 -10742 0
 10739  10740 -10741 -288  10743 0
 10739  10740 -10741 -288 -10744 0

c  2+1 --> break 
c    (-b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧  p_288) -> break
c  in CNF:
c     b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 10739 -10740  10741 -288 1162 0


c  2-1 --> 1
c    (-b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧ -p_288) -> (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0)
c  in CNF:
c     b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_2
c     b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_1
c     b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨  b^{9, 33}_0
c  in DIMACS:
 10739 -10740  10741  288 -10742 0
 10739 -10740  10741  288 -10743 0
 10739 -10740  10741  288  10744 0

c  1-1 --> 0
c    (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0 ∧ -p_288) -> (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧ -b^{9, 33}_0)
c  in CNF:
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_2
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_1
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_0
c  in DIMACS:
 10739  10740 -10741  288 -10742 0
 10739  10740 -10741  288 -10743 0
 10739  10740 -10741  288 -10744 0

c  0-1 --> -1
c    (-b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧ -p_288) -> ( b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0)
c  in CNF:
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨  b^{9, 33}_2
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_1
c     b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨  b^{9, 33}_0
c  in DIMACS:
 10739  10740  10741  288  10742 0
 10739  10740  10741  288 -10743 0
 10739  10740  10741  288  10744 0

c  -1-1 --> -2
c    ( b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧  b^{9, 32}_0 ∧ -p_288) -> ( b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0)
c  in CNF:
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨  b^{9, 33}_2
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨  b^{9, 33}_1
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨  p_288 ∨ -b^{9, 33}_0
c  in DIMACS:
-10739  10740 -10741  288  10742 0
-10739  10740 -10741  288  10743 0
-10739  10740 -10741  288 -10744 0

c  -2-1 --> break 
c    ( b^{9, 32}_2 ∧  b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨  b^{9, 32}_0 ∨  p_288 ∨ break
c  in DIMACS:
-10739 -10740  10741  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 32}_2 ∧ -b^{9, 32}_1 ∧ -b^{9, 32}_0 ∧ true) 
c  in CNF:
c    -b^{9, 32}_2 ∨  b^{9, 32}_1 ∨  b^{9, 32}_0 ∨ false 
c  in DIMACS:
-10739  10740  10741  0

c  3 does not represent an automaton state.
c    -(-b^{9, 32}_2 ∧  b^{9, 32}_1 ∧  b^{9, 32}_0 ∧ true) 
c  in CNF:
c     b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ false 
c  in DIMACS:
 10739 -10740 -10741  0
c  -3 does not represent an automaton state.
c    -( b^{9, 32}_2 ∧  b^{9, 32}_1 ∧  b^{9, 32}_0 ∧ true) 
c  in CNF:
c    -b^{9, 32}_2 ∨ -b^{9, 32}_1 ∨ -b^{9, 32}_0 ∨ false 
c  in DIMACS:
-10739 -10740 -10741  0

c i = 33
c  -2+1 --> -1
c    ( b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧  p_297) -> ( b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0)
c  in CNF:
c    -b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨  b^{9, 34}_2
c    -b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_1
c    -b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨  b^{9, 34}_0
c  in DIMACS:
-10742 -10743  10744 -297  10745 0
-10742 -10743  10744 -297 -10746 0
-10742 -10743  10744 -297  10747 0

c  -1+1 --> 0
c    ( b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0 ∧  p_297) -> (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧ -b^{9, 34}_0)
c  in CNF:
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_2
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_1
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_0
c  in DIMACS:
-10742  10743 -10744 -297 -10745 0
-10742  10743 -10744 -297 -10746 0
-10742  10743 -10744 -297 -10747 0

c  0+1 --> 1
c    (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧  p_297) -> (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0)
c  in CNF:
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_2
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_1
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨  b^{9, 34}_0
c  in DIMACS:
 10742  10743  10744 -297 -10745 0
 10742  10743  10744 -297 -10746 0
 10742  10743  10744 -297  10747 0

c  1+1 --> 2
c    (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0 ∧  p_297) -> (-b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0)
c  in CNF:
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_2
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨  b^{9, 34}_1
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ -p_297 ∨ -b^{9, 34}_0
c  in DIMACS:
 10742  10743 -10744 -297 -10745 0
 10742  10743 -10744 -297  10746 0
 10742  10743 -10744 -297 -10747 0

c  2+1 --> break 
c    (-b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧  p_297) -> break
c  in CNF:
c     b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 10742 -10743  10744 -297 1162 0


c  2-1 --> 1
c    (-b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧ -p_297) -> (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0)
c  in CNF:
c     b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_2
c     b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_1
c     b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨  b^{9, 34}_0
c  in DIMACS:
 10742 -10743  10744  297 -10745 0
 10742 -10743  10744  297 -10746 0
 10742 -10743  10744  297  10747 0

c  1-1 --> 0
c    (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0 ∧ -p_297) -> (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧ -b^{9, 34}_0)
c  in CNF:
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_2
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_1
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_0
c  in DIMACS:
 10742  10743 -10744  297 -10745 0
 10742  10743 -10744  297 -10746 0
 10742  10743 -10744  297 -10747 0

c  0-1 --> -1
c    (-b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧ -p_297) -> ( b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0)
c  in CNF:
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨  b^{9, 34}_2
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_1
c     b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨  b^{9, 34}_0
c  in DIMACS:
 10742  10743  10744  297  10745 0
 10742  10743  10744  297 -10746 0
 10742  10743  10744  297  10747 0

c  -1-1 --> -2
c    ( b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧  b^{9, 33}_0 ∧ -p_297) -> ( b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0)
c  in CNF:
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨  b^{9, 34}_2
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨  b^{9, 34}_1
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨  p_297 ∨ -b^{9, 34}_0
c  in DIMACS:
-10742  10743 -10744  297  10745 0
-10742  10743 -10744  297  10746 0
-10742  10743 -10744  297 -10747 0

c  -2-1 --> break 
c    ( b^{9, 33}_2 ∧  b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨  b^{9, 33}_0 ∨  p_297 ∨ break
c  in DIMACS:
-10742 -10743  10744  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 33}_2 ∧ -b^{9, 33}_1 ∧ -b^{9, 33}_0 ∧ true) 
c  in CNF:
c    -b^{9, 33}_2 ∨  b^{9, 33}_1 ∨  b^{9, 33}_0 ∨ false 
c  in DIMACS:
-10742  10743  10744  0

c  3 does not represent an automaton state.
c    -(-b^{9, 33}_2 ∧  b^{9, 33}_1 ∧  b^{9, 33}_0 ∧ true) 
c  in CNF:
c     b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ false 
c  in DIMACS:
 10742 -10743 -10744  0
c  -3 does not represent an automaton state.
c    -( b^{9, 33}_2 ∧  b^{9, 33}_1 ∧  b^{9, 33}_0 ∧ true) 
c  in CNF:
c    -b^{9, 33}_2 ∨ -b^{9, 33}_1 ∨ -b^{9, 33}_0 ∨ false 
c  in DIMACS:
-10742 -10743 -10744  0

c i = 34
c  -2+1 --> -1
c    ( b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧  p_306) -> ( b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0)
c  in CNF:
c    -b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨  b^{9, 35}_2
c    -b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_1
c    -b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨  b^{9, 35}_0
c  in DIMACS:
-10745 -10746  10747 -306  10748 0
-10745 -10746  10747 -306 -10749 0
-10745 -10746  10747 -306  10750 0

c  -1+1 --> 0
c    ( b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0 ∧  p_306) -> (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧ -b^{9, 35}_0)
c  in CNF:
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_2
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_1
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_0
c  in DIMACS:
-10745  10746 -10747 -306 -10748 0
-10745  10746 -10747 -306 -10749 0
-10745  10746 -10747 -306 -10750 0

c  0+1 --> 1
c    (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧  p_306) -> (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0)
c  in CNF:
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_2
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_1
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨  b^{9, 35}_0
c  in DIMACS:
 10745  10746  10747 -306 -10748 0
 10745  10746  10747 -306 -10749 0
 10745  10746  10747 -306  10750 0

c  1+1 --> 2
c    (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0 ∧  p_306) -> (-b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0)
c  in CNF:
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_2
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨  b^{9, 35}_1
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ -p_306 ∨ -b^{9, 35}_0
c  in DIMACS:
 10745  10746 -10747 -306 -10748 0
 10745  10746 -10747 -306  10749 0
 10745  10746 -10747 -306 -10750 0

c  2+1 --> break 
c    (-b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧  p_306) -> break
c  in CNF:
c     b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 10745 -10746  10747 -306 1162 0


c  2-1 --> 1
c    (-b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧ -p_306) -> (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0)
c  in CNF:
c     b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_2
c     b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_1
c     b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨  b^{9, 35}_0
c  in DIMACS:
 10745 -10746  10747  306 -10748 0
 10745 -10746  10747  306 -10749 0
 10745 -10746  10747  306  10750 0

c  1-1 --> 0
c    (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0 ∧ -p_306) -> (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧ -b^{9, 35}_0)
c  in CNF:
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_2
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_1
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_0
c  in DIMACS:
 10745  10746 -10747  306 -10748 0
 10745  10746 -10747  306 -10749 0
 10745  10746 -10747  306 -10750 0

c  0-1 --> -1
c    (-b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧ -p_306) -> ( b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0)
c  in CNF:
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨  b^{9, 35}_2
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_1
c     b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨  b^{9, 35}_0
c  in DIMACS:
 10745  10746  10747  306  10748 0
 10745  10746  10747  306 -10749 0
 10745  10746  10747  306  10750 0

c  -1-1 --> -2
c    ( b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧  b^{9, 34}_0 ∧ -p_306) -> ( b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0)
c  in CNF:
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨  b^{9, 35}_2
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨  b^{9, 35}_1
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨  p_306 ∨ -b^{9, 35}_0
c  in DIMACS:
-10745  10746 -10747  306  10748 0
-10745  10746 -10747  306  10749 0
-10745  10746 -10747  306 -10750 0

c  -2-1 --> break 
c    ( b^{9, 34}_2 ∧  b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨  b^{9, 34}_0 ∨  p_306 ∨ break
c  in DIMACS:
-10745 -10746  10747  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 34}_2 ∧ -b^{9, 34}_1 ∧ -b^{9, 34}_0 ∧ true) 
c  in CNF:
c    -b^{9, 34}_2 ∨  b^{9, 34}_1 ∨  b^{9, 34}_0 ∨ false 
c  in DIMACS:
-10745  10746  10747  0

c  3 does not represent an automaton state.
c    -(-b^{9, 34}_2 ∧  b^{9, 34}_1 ∧  b^{9, 34}_0 ∧ true) 
c  in CNF:
c     b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ false 
c  in DIMACS:
 10745 -10746 -10747  0
c  -3 does not represent an automaton state.
c    -( b^{9, 34}_2 ∧  b^{9, 34}_1 ∧  b^{9, 34}_0 ∧ true) 
c  in CNF:
c    -b^{9, 34}_2 ∨ -b^{9, 34}_1 ∨ -b^{9, 34}_0 ∨ false 
c  in DIMACS:
-10745 -10746 -10747  0

c i = 35
c  -2+1 --> -1
c    ( b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧  p_315) -> ( b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0)
c  in CNF:
c    -b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨  b^{9, 36}_2
c    -b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_1
c    -b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨  b^{9, 36}_0
c  in DIMACS:
-10748 -10749  10750 -315  10751 0
-10748 -10749  10750 -315 -10752 0
-10748 -10749  10750 -315  10753 0

c  -1+1 --> 0
c    ( b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0 ∧  p_315) -> (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧ -b^{9, 36}_0)
c  in CNF:
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_2
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_1
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_0
c  in DIMACS:
-10748  10749 -10750 -315 -10751 0
-10748  10749 -10750 -315 -10752 0
-10748  10749 -10750 -315 -10753 0

c  0+1 --> 1
c    (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧  p_315) -> (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0)
c  in CNF:
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_2
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_1
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨  b^{9, 36}_0
c  in DIMACS:
 10748  10749  10750 -315 -10751 0
 10748  10749  10750 -315 -10752 0
 10748  10749  10750 -315  10753 0

c  1+1 --> 2
c    (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0 ∧  p_315) -> (-b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0)
c  in CNF:
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_2
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨  b^{9, 36}_1
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ -p_315 ∨ -b^{9, 36}_0
c  in DIMACS:
 10748  10749 -10750 -315 -10751 0
 10748  10749 -10750 -315  10752 0
 10748  10749 -10750 -315 -10753 0

c  2+1 --> break 
c    (-b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧  p_315) -> break
c  in CNF:
c     b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 10748 -10749  10750 -315 1162 0


c  2-1 --> 1
c    (-b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧ -p_315) -> (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0)
c  in CNF:
c     b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_2
c     b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_1
c     b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨  b^{9, 36}_0
c  in DIMACS:
 10748 -10749  10750  315 -10751 0
 10748 -10749  10750  315 -10752 0
 10748 -10749  10750  315  10753 0

c  1-1 --> 0
c    (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0 ∧ -p_315) -> (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧ -b^{9, 36}_0)
c  in CNF:
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_2
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_1
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_0
c  in DIMACS:
 10748  10749 -10750  315 -10751 0
 10748  10749 -10750  315 -10752 0
 10748  10749 -10750  315 -10753 0

c  0-1 --> -1
c    (-b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧ -p_315) -> ( b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0)
c  in CNF:
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨  b^{9, 36}_2
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_1
c     b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨  b^{9, 36}_0
c  in DIMACS:
 10748  10749  10750  315  10751 0
 10748  10749  10750  315 -10752 0
 10748  10749  10750  315  10753 0

c  -1-1 --> -2
c    ( b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧  b^{9, 35}_0 ∧ -p_315) -> ( b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0)
c  in CNF:
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨  b^{9, 36}_2
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨  b^{9, 36}_1
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨  p_315 ∨ -b^{9, 36}_0
c  in DIMACS:
-10748  10749 -10750  315  10751 0
-10748  10749 -10750  315  10752 0
-10748  10749 -10750  315 -10753 0

c  -2-1 --> break 
c    ( b^{9, 35}_2 ∧  b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨  b^{9, 35}_0 ∨  p_315 ∨ break
c  in DIMACS:
-10748 -10749  10750  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 35}_2 ∧ -b^{9, 35}_1 ∧ -b^{9, 35}_0 ∧ true) 
c  in CNF:
c    -b^{9, 35}_2 ∨  b^{9, 35}_1 ∨  b^{9, 35}_0 ∨ false 
c  in DIMACS:
-10748  10749  10750  0

c  3 does not represent an automaton state.
c    -(-b^{9, 35}_2 ∧  b^{9, 35}_1 ∧  b^{9, 35}_0 ∧ true) 
c  in CNF:
c     b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ false 
c  in DIMACS:
 10748 -10749 -10750  0
c  -3 does not represent an automaton state.
c    -( b^{9, 35}_2 ∧  b^{9, 35}_1 ∧  b^{9, 35}_0 ∧ true) 
c  in CNF:
c    -b^{9, 35}_2 ∨ -b^{9, 35}_1 ∨ -b^{9, 35}_0 ∨ false 
c  in DIMACS:
-10748 -10749 -10750  0

c i = 36
c  -2+1 --> -1
c    ( b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧  p_324) -> ( b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0)
c  in CNF:
c    -b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨  b^{9, 37}_2
c    -b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_1
c    -b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨  b^{9, 37}_0
c  in DIMACS:
-10751 -10752  10753 -324  10754 0
-10751 -10752  10753 -324 -10755 0
-10751 -10752  10753 -324  10756 0

c  -1+1 --> 0
c    ( b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0 ∧  p_324) -> (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧ -b^{9, 37}_0)
c  in CNF:
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_2
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_1
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_0
c  in DIMACS:
-10751  10752 -10753 -324 -10754 0
-10751  10752 -10753 -324 -10755 0
-10751  10752 -10753 -324 -10756 0

c  0+1 --> 1
c    (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧  p_324) -> (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0)
c  in CNF:
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_2
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_1
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨  b^{9, 37}_0
c  in DIMACS:
 10751  10752  10753 -324 -10754 0
 10751  10752  10753 -324 -10755 0
 10751  10752  10753 -324  10756 0

c  1+1 --> 2
c    (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0 ∧  p_324) -> (-b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0)
c  in CNF:
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_2
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨  b^{9, 37}_1
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ -p_324 ∨ -b^{9, 37}_0
c  in DIMACS:
 10751  10752 -10753 -324 -10754 0
 10751  10752 -10753 -324  10755 0
 10751  10752 -10753 -324 -10756 0

c  2+1 --> break 
c    (-b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧  p_324) -> break
c  in CNF:
c     b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 10751 -10752  10753 -324 1162 0


c  2-1 --> 1
c    (-b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧ -p_324) -> (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0)
c  in CNF:
c     b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_2
c     b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_1
c     b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨  b^{9, 37}_0
c  in DIMACS:
 10751 -10752  10753  324 -10754 0
 10751 -10752  10753  324 -10755 0
 10751 -10752  10753  324  10756 0

c  1-1 --> 0
c    (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0 ∧ -p_324) -> (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧ -b^{9, 37}_0)
c  in CNF:
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_2
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_1
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_0
c  in DIMACS:
 10751  10752 -10753  324 -10754 0
 10751  10752 -10753  324 -10755 0
 10751  10752 -10753  324 -10756 0

c  0-1 --> -1
c    (-b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧ -p_324) -> ( b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0)
c  in CNF:
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨  b^{9, 37}_2
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_1
c     b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨  b^{9, 37}_0
c  in DIMACS:
 10751  10752  10753  324  10754 0
 10751  10752  10753  324 -10755 0
 10751  10752  10753  324  10756 0

c  -1-1 --> -2
c    ( b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧  b^{9, 36}_0 ∧ -p_324) -> ( b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0)
c  in CNF:
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨  b^{9, 37}_2
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨  b^{9, 37}_1
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨  p_324 ∨ -b^{9, 37}_0
c  in DIMACS:
-10751  10752 -10753  324  10754 0
-10751  10752 -10753  324  10755 0
-10751  10752 -10753  324 -10756 0

c  -2-1 --> break 
c    ( b^{9, 36}_2 ∧  b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨  b^{9, 36}_0 ∨  p_324 ∨ break
c  in DIMACS:
-10751 -10752  10753  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 36}_2 ∧ -b^{9, 36}_1 ∧ -b^{9, 36}_0 ∧ true) 
c  in CNF:
c    -b^{9, 36}_2 ∨  b^{9, 36}_1 ∨  b^{9, 36}_0 ∨ false 
c  in DIMACS:
-10751  10752  10753  0

c  3 does not represent an automaton state.
c    -(-b^{9, 36}_2 ∧  b^{9, 36}_1 ∧  b^{9, 36}_0 ∧ true) 
c  in CNF:
c     b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ false 
c  in DIMACS:
 10751 -10752 -10753  0
c  -3 does not represent an automaton state.
c    -( b^{9, 36}_2 ∧  b^{9, 36}_1 ∧  b^{9, 36}_0 ∧ true) 
c  in CNF:
c    -b^{9, 36}_2 ∨ -b^{9, 36}_1 ∨ -b^{9, 36}_0 ∨ false 
c  in DIMACS:
-10751 -10752 -10753  0

c i = 37
c  -2+1 --> -1
c    ( b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧  p_333) -> ( b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0)
c  in CNF:
c    -b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨  b^{9, 38}_2
c    -b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_1
c    -b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨  b^{9, 38}_0
c  in DIMACS:
-10754 -10755  10756 -333  10757 0
-10754 -10755  10756 -333 -10758 0
-10754 -10755  10756 -333  10759 0

c  -1+1 --> 0
c    ( b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0 ∧  p_333) -> (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧ -b^{9, 38}_0)
c  in CNF:
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_2
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_1
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_0
c  in DIMACS:
-10754  10755 -10756 -333 -10757 0
-10754  10755 -10756 -333 -10758 0
-10754  10755 -10756 -333 -10759 0

c  0+1 --> 1
c    (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧  p_333) -> (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0)
c  in CNF:
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_2
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_1
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨  b^{9, 38}_0
c  in DIMACS:
 10754  10755  10756 -333 -10757 0
 10754  10755  10756 -333 -10758 0
 10754  10755  10756 -333  10759 0

c  1+1 --> 2
c    (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0 ∧  p_333) -> (-b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0)
c  in CNF:
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_2
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨  b^{9, 38}_1
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ -p_333 ∨ -b^{9, 38}_0
c  in DIMACS:
 10754  10755 -10756 -333 -10757 0
 10754  10755 -10756 -333  10758 0
 10754  10755 -10756 -333 -10759 0

c  2+1 --> break 
c    (-b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧  p_333) -> break
c  in CNF:
c     b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 10754 -10755  10756 -333 1162 0


c  2-1 --> 1
c    (-b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧ -p_333) -> (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0)
c  in CNF:
c     b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_2
c     b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_1
c     b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨  b^{9, 38}_0
c  in DIMACS:
 10754 -10755  10756  333 -10757 0
 10754 -10755  10756  333 -10758 0
 10754 -10755  10756  333  10759 0

c  1-1 --> 0
c    (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0 ∧ -p_333) -> (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧ -b^{9, 38}_0)
c  in CNF:
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_2
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_1
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_0
c  in DIMACS:
 10754  10755 -10756  333 -10757 0
 10754  10755 -10756  333 -10758 0
 10754  10755 -10756  333 -10759 0

c  0-1 --> -1
c    (-b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧ -p_333) -> ( b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0)
c  in CNF:
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨  b^{9, 38}_2
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_1
c     b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨  b^{9, 38}_0
c  in DIMACS:
 10754  10755  10756  333  10757 0
 10754  10755  10756  333 -10758 0
 10754  10755  10756  333  10759 0

c  -1-1 --> -2
c    ( b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧  b^{9, 37}_0 ∧ -p_333) -> ( b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0)
c  in CNF:
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨  b^{9, 38}_2
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨  b^{9, 38}_1
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨  p_333 ∨ -b^{9, 38}_0
c  in DIMACS:
-10754  10755 -10756  333  10757 0
-10754  10755 -10756  333  10758 0
-10754  10755 -10756  333 -10759 0

c  -2-1 --> break 
c    ( b^{9, 37}_2 ∧  b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨  b^{9, 37}_0 ∨  p_333 ∨ break
c  in DIMACS:
-10754 -10755  10756  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 37}_2 ∧ -b^{9, 37}_1 ∧ -b^{9, 37}_0 ∧ true) 
c  in CNF:
c    -b^{9, 37}_2 ∨  b^{9, 37}_1 ∨  b^{9, 37}_0 ∨ false 
c  in DIMACS:
-10754  10755  10756  0

c  3 does not represent an automaton state.
c    -(-b^{9, 37}_2 ∧  b^{9, 37}_1 ∧  b^{9, 37}_0 ∧ true) 
c  in CNF:
c     b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ false 
c  in DIMACS:
 10754 -10755 -10756  0
c  -3 does not represent an automaton state.
c    -( b^{9, 37}_2 ∧  b^{9, 37}_1 ∧  b^{9, 37}_0 ∧ true) 
c  in CNF:
c    -b^{9, 37}_2 ∨ -b^{9, 37}_1 ∨ -b^{9, 37}_0 ∨ false 
c  in DIMACS:
-10754 -10755 -10756  0

c i = 38
c  -2+1 --> -1
c    ( b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧  p_342) -> ( b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0)
c  in CNF:
c    -b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨  b^{9, 39}_2
c    -b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_1
c    -b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨  b^{9, 39}_0
c  in DIMACS:
-10757 -10758  10759 -342  10760 0
-10757 -10758  10759 -342 -10761 0
-10757 -10758  10759 -342  10762 0

c  -1+1 --> 0
c    ( b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0 ∧  p_342) -> (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧ -b^{9, 39}_0)
c  in CNF:
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_2
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_1
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_0
c  in DIMACS:
-10757  10758 -10759 -342 -10760 0
-10757  10758 -10759 -342 -10761 0
-10757  10758 -10759 -342 -10762 0

c  0+1 --> 1
c    (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧  p_342) -> (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0)
c  in CNF:
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_2
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_1
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨  b^{9, 39}_0
c  in DIMACS:
 10757  10758  10759 -342 -10760 0
 10757  10758  10759 -342 -10761 0
 10757  10758  10759 -342  10762 0

c  1+1 --> 2
c    (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0 ∧  p_342) -> (-b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0)
c  in CNF:
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_2
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨  b^{9, 39}_1
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ -p_342 ∨ -b^{9, 39}_0
c  in DIMACS:
 10757  10758 -10759 -342 -10760 0
 10757  10758 -10759 -342  10761 0
 10757  10758 -10759 -342 -10762 0

c  2+1 --> break 
c    (-b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧  p_342) -> break
c  in CNF:
c     b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 10757 -10758  10759 -342 1162 0


c  2-1 --> 1
c    (-b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧ -p_342) -> (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0)
c  in CNF:
c     b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_2
c     b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_1
c     b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨  b^{9, 39}_0
c  in DIMACS:
 10757 -10758  10759  342 -10760 0
 10757 -10758  10759  342 -10761 0
 10757 -10758  10759  342  10762 0

c  1-1 --> 0
c    (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0 ∧ -p_342) -> (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧ -b^{9, 39}_0)
c  in CNF:
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_2
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_1
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_0
c  in DIMACS:
 10757  10758 -10759  342 -10760 0
 10757  10758 -10759  342 -10761 0
 10757  10758 -10759  342 -10762 0

c  0-1 --> -1
c    (-b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧ -p_342) -> ( b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0)
c  in CNF:
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨  b^{9, 39}_2
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_1
c     b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨  b^{9, 39}_0
c  in DIMACS:
 10757  10758  10759  342  10760 0
 10757  10758  10759  342 -10761 0
 10757  10758  10759  342  10762 0

c  -1-1 --> -2
c    ( b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧  b^{9, 38}_0 ∧ -p_342) -> ( b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0)
c  in CNF:
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨  b^{9, 39}_2
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨  b^{9, 39}_1
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨  p_342 ∨ -b^{9, 39}_0
c  in DIMACS:
-10757  10758 -10759  342  10760 0
-10757  10758 -10759  342  10761 0
-10757  10758 -10759  342 -10762 0

c  -2-1 --> break 
c    ( b^{9, 38}_2 ∧  b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨  b^{9, 38}_0 ∨  p_342 ∨ break
c  in DIMACS:
-10757 -10758  10759  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 38}_2 ∧ -b^{9, 38}_1 ∧ -b^{9, 38}_0 ∧ true) 
c  in CNF:
c    -b^{9, 38}_2 ∨  b^{9, 38}_1 ∨  b^{9, 38}_0 ∨ false 
c  in DIMACS:
-10757  10758  10759  0

c  3 does not represent an automaton state.
c    -(-b^{9, 38}_2 ∧  b^{9, 38}_1 ∧  b^{9, 38}_0 ∧ true) 
c  in CNF:
c     b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ false 
c  in DIMACS:
 10757 -10758 -10759  0
c  -3 does not represent an automaton state.
c    -( b^{9, 38}_2 ∧  b^{9, 38}_1 ∧  b^{9, 38}_0 ∧ true) 
c  in CNF:
c    -b^{9, 38}_2 ∨ -b^{9, 38}_1 ∨ -b^{9, 38}_0 ∨ false 
c  in DIMACS:
-10757 -10758 -10759  0

c i = 39
c  -2+1 --> -1
c    ( b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧  p_351) -> ( b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0)
c  in CNF:
c    -b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨  b^{9, 40}_2
c    -b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_1
c    -b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨  b^{9, 40}_0
c  in DIMACS:
-10760 -10761  10762 -351  10763 0
-10760 -10761  10762 -351 -10764 0
-10760 -10761  10762 -351  10765 0

c  -1+1 --> 0
c    ( b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0 ∧  p_351) -> (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧ -b^{9, 40}_0)
c  in CNF:
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_2
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_1
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_0
c  in DIMACS:
-10760  10761 -10762 -351 -10763 0
-10760  10761 -10762 -351 -10764 0
-10760  10761 -10762 -351 -10765 0

c  0+1 --> 1
c    (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧  p_351) -> (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0)
c  in CNF:
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_2
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_1
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨  b^{9, 40}_0
c  in DIMACS:
 10760  10761  10762 -351 -10763 0
 10760  10761  10762 -351 -10764 0
 10760  10761  10762 -351  10765 0

c  1+1 --> 2
c    (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0 ∧  p_351) -> (-b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0)
c  in CNF:
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_2
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨  b^{9, 40}_1
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ -p_351 ∨ -b^{9, 40}_0
c  in DIMACS:
 10760  10761 -10762 -351 -10763 0
 10760  10761 -10762 -351  10764 0
 10760  10761 -10762 -351 -10765 0

c  2+1 --> break 
c    (-b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧  p_351) -> break
c  in CNF:
c     b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 10760 -10761  10762 -351 1162 0


c  2-1 --> 1
c    (-b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧ -p_351) -> (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0)
c  in CNF:
c     b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_2
c     b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_1
c     b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨  b^{9, 40}_0
c  in DIMACS:
 10760 -10761  10762  351 -10763 0
 10760 -10761  10762  351 -10764 0
 10760 -10761  10762  351  10765 0

c  1-1 --> 0
c    (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0 ∧ -p_351) -> (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧ -b^{9, 40}_0)
c  in CNF:
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_2
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_1
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_0
c  in DIMACS:
 10760  10761 -10762  351 -10763 0
 10760  10761 -10762  351 -10764 0
 10760  10761 -10762  351 -10765 0

c  0-1 --> -1
c    (-b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧ -p_351) -> ( b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0)
c  in CNF:
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨  b^{9, 40}_2
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_1
c     b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨  b^{9, 40}_0
c  in DIMACS:
 10760  10761  10762  351  10763 0
 10760  10761  10762  351 -10764 0
 10760  10761  10762  351  10765 0

c  -1-1 --> -2
c    ( b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧  b^{9, 39}_0 ∧ -p_351) -> ( b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0)
c  in CNF:
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨  b^{9, 40}_2
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨  b^{9, 40}_1
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨  p_351 ∨ -b^{9, 40}_0
c  in DIMACS:
-10760  10761 -10762  351  10763 0
-10760  10761 -10762  351  10764 0
-10760  10761 -10762  351 -10765 0

c  -2-1 --> break 
c    ( b^{9, 39}_2 ∧  b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨  b^{9, 39}_0 ∨  p_351 ∨ break
c  in DIMACS:
-10760 -10761  10762  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 39}_2 ∧ -b^{9, 39}_1 ∧ -b^{9, 39}_0 ∧ true) 
c  in CNF:
c    -b^{9, 39}_2 ∨  b^{9, 39}_1 ∨  b^{9, 39}_0 ∨ false 
c  in DIMACS:
-10760  10761  10762  0

c  3 does not represent an automaton state.
c    -(-b^{9, 39}_2 ∧  b^{9, 39}_1 ∧  b^{9, 39}_0 ∧ true) 
c  in CNF:
c     b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ false 
c  in DIMACS:
 10760 -10761 -10762  0
c  -3 does not represent an automaton state.
c    -( b^{9, 39}_2 ∧  b^{9, 39}_1 ∧  b^{9, 39}_0 ∧ true) 
c  in CNF:
c    -b^{9, 39}_2 ∨ -b^{9, 39}_1 ∨ -b^{9, 39}_0 ∨ false 
c  in DIMACS:
-10760 -10761 -10762  0

c i = 40
c  -2+1 --> -1
c    ( b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧  p_360) -> ( b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0)
c  in CNF:
c    -b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨  b^{9, 41}_2
c    -b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_1
c    -b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨  b^{9, 41}_0
c  in DIMACS:
-10763 -10764  10765 -360  10766 0
-10763 -10764  10765 -360 -10767 0
-10763 -10764  10765 -360  10768 0

c  -1+1 --> 0
c    ( b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0 ∧  p_360) -> (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧ -b^{9, 41}_0)
c  in CNF:
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_2
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_1
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_0
c  in DIMACS:
-10763  10764 -10765 -360 -10766 0
-10763  10764 -10765 -360 -10767 0
-10763  10764 -10765 -360 -10768 0

c  0+1 --> 1
c    (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧  p_360) -> (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0)
c  in CNF:
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_2
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_1
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨  b^{9, 41}_0
c  in DIMACS:
 10763  10764  10765 -360 -10766 0
 10763  10764  10765 -360 -10767 0
 10763  10764  10765 -360  10768 0

c  1+1 --> 2
c    (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0 ∧  p_360) -> (-b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0)
c  in CNF:
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_2
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨  b^{9, 41}_1
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ -p_360 ∨ -b^{9, 41}_0
c  in DIMACS:
 10763  10764 -10765 -360 -10766 0
 10763  10764 -10765 -360  10767 0
 10763  10764 -10765 -360 -10768 0

c  2+1 --> break 
c    (-b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧  p_360) -> break
c  in CNF:
c     b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 10763 -10764  10765 -360 1162 0


c  2-1 --> 1
c    (-b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧ -p_360) -> (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0)
c  in CNF:
c     b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_2
c     b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_1
c     b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨  b^{9, 41}_0
c  in DIMACS:
 10763 -10764  10765  360 -10766 0
 10763 -10764  10765  360 -10767 0
 10763 -10764  10765  360  10768 0

c  1-1 --> 0
c    (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0 ∧ -p_360) -> (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧ -b^{9, 41}_0)
c  in CNF:
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_2
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_1
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_0
c  in DIMACS:
 10763  10764 -10765  360 -10766 0
 10763  10764 -10765  360 -10767 0
 10763  10764 -10765  360 -10768 0

c  0-1 --> -1
c    (-b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧ -p_360) -> ( b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0)
c  in CNF:
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨  b^{9, 41}_2
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_1
c     b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨  b^{9, 41}_0
c  in DIMACS:
 10763  10764  10765  360  10766 0
 10763  10764  10765  360 -10767 0
 10763  10764  10765  360  10768 0

c  -1-1 --> -2
c    ( b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧  b^{9, 40}_0 ∧ -p_360) -> ( b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0)
c  in CNF:
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨  b^{9, 41}_2
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨  b^{9, 41}_1
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨  p_360 ∨ -b^{9, 41}_0
c  in DIMACS:
-10763  10764 -10765  360  10766 0
-10763  10764 -10765  360  10767 0
-10763  10764 -10765  360 -10768 0

c  -2-1 --> break 
c    ( b^{9, 40}_2 ∧  b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨  b^{9, 40}_0 ∨  p_360 ∨ break
c  in DIMACS:
-10763 -10764  10765  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 40}_2 ∧ -b^{9, 40}_1 ∧ -b^{9, 40}_0 ∧ true) 
c  in CNF:
c    -b^{9, 40}_2 ∨  b^{9, 40}_1 ∨  b^{9, 40}_0 ∨ false 
c  in DIMACS:
-10763  10764  10765  0

c  3 does not represent an automaton state.
c    -(-b^{9, 40}_2 ∧  b^{9, 40}_1 ∧  b^{9, 40}_0 ∧ true) 
c  in CNF:
c     b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ false 
c  in DIMACS:
 10763 -10764 -10765  0
c  -3 does not represent an automaton state.
c    -( b^{9, 40}_2 ∧  b^{9, 40}_1 ∧  b^{9, 40}_0 ∧ true) 
c  in CNF:
c    -b^{9, 40}_2 ∨ -b^{9, 40}_1 ∨ -b^{9, 40}_0 ∨ false 
c  in DIMACS:
-10763 -10764 -10765  0

c i = 41
c  -2+1 --> -1
c    ( b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧  p_369) -> ( b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0)
c  in CNF:
c    -b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨  b^{9, 42}_2
c    -b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_1
c    -b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨  b^{9, 42}_0
c  in DIMACS:
-10766 -10767  10768 -369  10769 0
-10766 -10767  10768 -369 -10770 0
-10766 -10767  10768 -369  10771 0

c  -1+1 --> 0
c    ( b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0 ∧  p_369) -> (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧ -b^{9, 42}_0)
c  in CNF:
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_2
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_1
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_0
c  in DIMACS:
-10766  10767 -10768 -369 -10769 0
-10766  10767 -10768 -369 -10770 0
-10766  10767 -10768 -369 -10771 0

c  0+1 --> 1
c    (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧  p_369) -> (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0)
c  in CNF:
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_2
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_1
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨  b^{9, 42}_0
c  in DIMACS:
 10766  10767  10768 -369 -10769 0
 10766  10767  10768 -369 -10770 0
 10766  10767  10768 -369  10771 0

c  1+1 --> 2
c    (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0 ∧  p_369) -> (-b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0)
c  in CNF:
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_2
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨  b^{9, 42}_1
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ -p_369 ∨ -b^{9, 42}_0
c  in DIMACS:
 10766  10767 -10768 -369 -10769 0
 10766  10767 -10768 -369  10770 0
 10766  10767 -10768 -369 -10771 0

c  2+1 --> break 
c    (-b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧  p_369) -> break
c  in CNF:
c     b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 10766 -10767  10768 -369 1162 0


c  2-1 --> 1
c    (-b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧ -p_369) -> (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0)
c  in CNF:
c     b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_2
c     b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_1
c     b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨  b^{9, 42}_0
c  in DIMACS:
 10766 -10767  10768  369 -10769 0
 10766 -10767  10768  369 -10770 0
 10766 -10767  10768  369  10771 0

c  1-1 --> 0
c    (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0 ∧ -p_369) -> (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧ -b^{9, 42}_0)
c  in CNF:
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_2
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_1
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_0
c  in DIMACS:
 10766  10767 -10768  369 -10769 0
 10766  10767 -10768  369 -10770 0
 10766  10767 -10768  369 -10771 0

c  0-1 --> -1
c    (-b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧ -p_369) -> ( b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0)
c  in CNF:
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨  b^{9, 42}_2
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_1
c     b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨  b^{9, 42}_0
c  in DIMACS:
 10766  10767  10768  369  10769 0
 10766  10767  10768  369 -10770 0
 10766  10767  10768  369  10771 0

c  -1-1 --> -2
c    ( b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧  b^{9, 41}_0 ∧ -p_369) -> ( b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0)
c  in CNF:
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨  b^{9, 42}_2
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨  b^{9, 42}_1
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨  p_369 ∨ -b^{9, 42}_0
c  in DIMACS:
-10766  10767 -10768  369  10769 0
-10766  10767 -10768  369  10770 0
-10766  10767 -10768  369 -10771 0

c  -2-1 --> break 
c    ( b^{9, 41}_2 ∧  b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨  b^{9, 41}_0 ∨  p_369 ∨ break
c  in DIMACS:
-10766 -10767  10768  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 41}_2 ∧ -b^{9, 41}_1 ∧ -b^{9, 41}_0 ∧ true) 
c  in CNF:
c    -b^{9, 41}_2 ∨  b^{9, 41}_1 ∨  b^{9, 41}_0 ∨ false 
c  in DIMACS:
-10766  10767  10768  0

c  3 does not represent an automaton state.
c    -(-b^{9, 41}_2 ∧  b^{9, 41}_1 ∧  b^{9, 41}_0 ∧ true) 
c  in CNF:
c     b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ false 
c  in DIMACS:
 10766 -10767 -10768  0
c  -3 does not represent an automaton state.
c    -( b^{9, 41}_2 ∧  b^{9, 41}_1 ∧  b^{9, 41}_0 ∧ true) 
c  in CNF:
c    -b^{9, 41}_2 ∨ -b^{9, 41}_1 ∨ -b^{9, 41}_0 ∨ false 
c  in DIMACS:
-10766 -10767 -10768  0

c i = 42
c  -2+1 --> -1
c    ( b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧  p_378) -> ( b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0)
c  in CNF:
c    -b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨  b^{9, 43}_2
c    -b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_1
c    -b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨  b^{9, 43}_0
c  in DIMACS:
-10769 -10770  10771 -378  10772 0
-10769 -10770  10771 -378 -10773 0
-10769 -10770  10771 -378  10774 0

c  -1+1 --> 0
c    ( b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0 ∧  p_378) -> (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧ -b^{9, 43}_0)
c  in CNF:
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_2
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_1
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_0
c  in DIMACS:
-10769  10770 -10771 -378 -10772 0
-10769  10770 -10771 -378 -10773 0
-10769  10770 -10771 -378 -10774 0

c  0+1 --> 1
c    (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧  p_378) -> (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0)
c  in CNF:
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_2
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_1
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨  b^{9, 43}_0
c  in DIMACS:
 10769  10770  10771 -378 -10772 0
 10769  10770  10771 -378 -10773 0
 10769  10770  10771 -378  10774 0

c  1+1 --> 2
c    (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0 ∧  p_378) -> (-b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0)
c  in CNF:
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_2
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨  b^{9, 43}_1
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ -p_378 ∨ -b^{9, 43}_0
c  in DIMACS:
 10769  10770 -10771 -378 -10772 0
 10769  10770 -10771 -378  10773 0
 10769  10770 -10771 -378 -10774 0

c  2+1 --> break 
c    (-b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧  p_378) -> break
c  in CNF:
c     b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 10769 -10770  10771 -378 1162 0


c  2-1 --> 1
c    (-b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧ -p_378) -> (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0)
c  in CNF:
c     b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_2
c     b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_1
c     b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨  b^{9, 43}_0
c  in DIMACS:
 10769 -10770  10771  378 -10772 0
 10769 -10770  10771  378 -10773 0
 10769 -10770  10771  378  10774 0

c  1-1 --> 0
c    (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0 ∧ -p_378) -> (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧ -b^{9, 43}_0)
c  in CNF:
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_2
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_1
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_0
c  in DIMACS:
 10769  10770 -10771  378 -10772 0
 10769  10770 -10771  378 -10773 0
 10769  10770 -10771  378 -10774 0

c  0-1 --> -1
c    (-b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧ -p_378) -> ( b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0)
c  in CNF:
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨  b^{9, 43}_2
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_1
c     b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨  b^{9, 43}_0
c  in DIMACS:
 10769  10770  10771  378  10772 0
 10769  10770  10771  378 -10773 0
 10769  10770  10771  378  10774 0

c  -1-1 --> -2
c    ( b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧  b^{9, 42}_0 ∧ -p_378) -> ( b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0)
c  in CNF:
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨  b^{9, 43}_2
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨  b^{9, 43}_1
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨  p_378 ∨ -b^{9, 43}_0
c  in DIMACS:
-10769  10770 -10771  378  10772 0
-10769  10770 -10771  378  10773 0
-10769  10770 -10771  378 -10774 0

c  -2-1 --> break 
c    ( b^{9, 42}_2 ∧  b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨  b^{9, 42}_0 ∨  p_378 ∨ break
c  in DIMACS:
-10769 -10770  10771  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 42}_2 ∧ -b^{9, 42}_1 ∧ -b^{9, 42}_0 ∧ true) 
c  in CNF:
c    -b^{9, 42}_2 ∨  b^{9, 42}_1 ∨  b^{9, 42}_0 ∨ false 
c  in DIMACS:
-10769  10770  10771  0

c  3 does not represent an automaton state.
c    -(-b^{9, 42}_2 ∧  b^{9, 42}_1 ∧  b^{9, 42}_0 ∧ true) 
c  in CNF:
c     b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ false 
c  in DIMACS:
 10769 -10770 -10771  0
c  -3 does not represent an automaton state.
c    -( b^{9, 42}_2 ∧  b^{9, 42}_1 ∧  b^{9, 42}_0 ∧ true) 
c  in CNF:
c    -b^{9, 42}_2 ∨ -b^{9, 42}_1 ∨ -b^{9, 42}_0 ∨ false 
c  in DIMACS:
-10769 -10770 -10771  0

c i = 43
c  -2+1 --> -1
c    ( b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧  p_387) -> ( b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0)
c  in CNF:
c    -b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨  b^{9, 44}_2
c    -b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_1
c    -b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨  b^{9, 44}_0
c  in DIMACS:
-10772 -10773  10774 -387  10775 0
-10772 -10773  10774 -387 -10776 0
-10772 -10773  10774 -387  10777 0

c  -1+1 --> 0
c    ( b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0 ∧  p_387) -> (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧ -b^{9, 44}_0)
c  in CNF:
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_2
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_1
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_0
c  in DIMACS:
-10772  10773 -10774 -387 -10775 0
-10772  10773 -10774 -387 -10776 0
-10772  10773 -10774 -387 -10777 0

c  0+1 --> 1
c    (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧  p_387) -> (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0)
c  in CNF:
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_2
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_1
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨  b^{9, 44}_0
c  in DIMACS:
 10772  10773  10774 -387 -10775 0
 10772  10773  10774 -387 -10776 0
 10772  10773  10774 -387  10777 0

c  1+1 --> 2
c    (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0 ∧  p_387) -> (-b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0)
c  in CNF:
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_2
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨  b^{9, 44}_1
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ -p_387 ∨ -b^{9, 44}_0
c  in DIMACS:
 10772  10773 -10774 -387 -10775 0
 10772  10773 -10774 -387  10776 0
 10772  10773 -10774 -387 -10777 0

c  2+1 --> break 
c    (-b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧  p_387) -> break
c  in CNF:
c     b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 10772 -10773  10774 -387 1162 0


c  2-1 --> 1
c    (-b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧ -p_387) -> (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0)
c  in CNF:
c     b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_2
c     b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_1
c     b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨  b^{9, 44}_0
c  in DIMACS:
 10772 -10773  10774  387 -10775 0
 10772 -10773  10774  387 -10776 0
 10772 -10773  10774  387  10777 0

c  1-1 --> 0
c    (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0 ∧ -p_387) -> (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧ -b^{9, 44}_0)
c  in CNF:
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_2
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_1
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_0
c  in DIMACS:
 10772  10773 -10774  387 -10775 0
 10772  10773 -10774  387 -10776 0
 10772  10773 -10774  387 -10777 0

c  0-1 --> -1
c    (-b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧ -p_387) -> ( b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0)
c  in CNF:
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨  b^{9, 44}_2
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_1
c     b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨  b^{9, 44}_0
c  in DIMACS:
 10772  10773  10774  387  10775 0
 10772  10773  10774  387 -10776 0
 10772  10773  10774  387  10777 0

c  -1-1 --> -2
c    ( b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧  b^{9, 43}_0 ∧ -p_387) -> ( b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0)
c  in CNF:
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨  b^{9, 44}_2
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨  b^{9, 44}_1
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨  p_387 ∨ -b^{9, 44}_0
c  in DIMACS:
-10772  10773 -10774  387  10775 0
-10772  10773 -10774  387  10776 0
-10772  10773 -10774  387 -10777 0

c  -2-1 --> break 
c    ( b^{9, 43}_2 ∧  b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨  b^{9, 43}_0 ∨  p_387 ∨ break
c  in DIMACS:
-10772 -10773  10774  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 43}_2 ∧ -b^{9, 43}_1 ∧ -b^{9, 43}_0 ∧ true) 
c  in CNF:
c    -b^{9, 43}_2 ∨  b^{9, 43}_1 ∨  b^{9, 43}_0 ∨ false 
c  in DIMACS:
-10772  10773  10774  0

c  3 does not represent an automaton state.
c    -(-b^{9, 43}_2 ∧  b^{9, 43}_1 ∧  b^{9, 43}_0 ∧ true) 
c  in CNF:
c     b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ false 
c  in DIMACS:
 10772 -10773 -10774  0
c  -3 does not represent an automaton state.
c    -( b^{9, 43}_2 ∧  b^{9, 43}_1 ∧  b^{9, 43}_0 ∧ true) 
c  in CNF:
c    -b^{9, 43}_2 ∨ -b^{9, 43}_1 ∨ -b^{9, 43}_0 ∨ false 
c  in DIMACS:
-10772 -10773 -10774  0

c i = 44
c  -2+1 --> -1
c    ( b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧  p_396) -> ( b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0)
c  in CNF:
c    -b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨  b^{9, 45}_2
c    -b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_1
c    -b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨  b^{9, 45}_0
c  in DIMACS:
-10775 -10776  10777 -396  10778 0
-10775 -10776  10777 -396 -10779 0
-10775 -10776  10777 -396  10780 0

c  -1+1 --> 0
c    ( b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0 ∧  p_396) -> (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧ -b^{9, 45}_0)
c  in CNF:
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_2
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_1
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_0
c  in DIMACS:
-10775  10776 -10777 -396 -10778 0
-10775  10776 -10777 -396 -10779 0
-10775  10776 -10777 -396 -10780 0

c  0+1 --> 1
c    (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧  p_396) -> (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0)
c  in CNF:
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_2
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_1
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨  b^{9, 45}_0
c  in DIMACS:
 10775  10776  10777 -396 -10778 0
 10775  10776  10777 -396 -10779 0
 10775  10776  10777 -396  10780 0

c  1+1 --> 2
c    (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0 ∧  p_396) -> (-b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0)
c  in CNF:
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_2
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨  b^{9, 45}_1
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ -p_396 ∨ -b^{9, 45}_0
c  in DIMACS:
 10775  10776 -10777 -396 -10778 0
 10775  10776 -10777 -396  10779 0
 10775  10776 -10777 -396 -10780 0

c  2+1 --> break 
c    (-b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧  p_396) -> break
c  in CNF:
c     b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 10775 -10776  10777 -396 1162 0


c  2-1 --> 1
c    (-b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧ -p_396) -> (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0)
c  in CNF:
c     b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_2
c     b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_1
c     b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨  b^{9, 45}_0
c  in DIMACS:
 10775 -10776  10777  396 -10778 0
 10775 -10776  10777  396 -10779 0
 10775 -10776  10777  396  10780 0

c  1-1 --> 0
c    (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0 ∧ -p_396) -> (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧ -b^{9, 45}_0)
c  in CNF:
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_2
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_1
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_0
c  in DIMACS:
 10775  10776 -10777  396 -10778 0
 10775  10776 -10777  396 -10779 0
 10775  10776 -10777  396 -10780 0

c  0-1 --> -1
c    (-b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧ -p_396) -> ( b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0)
c  in CNF:
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨  b^{9, 45}_2
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_1
c     b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨  b^{9, 45}_0
c  in DIMACS:
 10775  10776  10777  396  10778 0
 10775  10776  10777  396 -10779 0
 10775  10776  10777  396  10780 0

c  -1-1 --> -2
c    ( b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧  b^{9, 44}_0 ∧ -p_396) -> ( b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0)
c  in CNF:
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨  b^{9, 45}_2
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨  b^{9, 45}_1
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨  p_396 ∨ -b^{9, 45}_0
c  in DIMACS:
-10775  10776 -10777  396  10778 0
-10775  10776 -10777  396  10779 0
-10775  10776 -10777  396 -10780 0

c  -2-1 --> break 
c    ( b^{9, 44}_2 ∧  b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨  b^{9, 44}_0 ∨  p_396 ∨ break
c  in DIMACS:
-10775 -10776  10777  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 44}_2 ∧ -b^{9, 44}_1 ∧ -b^{9, 44}_0 ∧ true) 
c  in CNF:
c    -b^{9, 44}_2 ∨  b^{9, 44}_1 ∨  b^{9, 44}_0 ∨ false 
c  in DIMACS:
-10775  10776  10777  0

c  3 does not represent an automaton state.
c    -(-b^{9, 44}_2 ∧  b^{9, 44}_1 ∧  b^{9, 44}_0 ∧ true) 
c  in CNF:
c     b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ false 
c  in DIMACS:
 10775 -10776 -10777  0
c  -3 does not represent an automaton state.
c    -( b^{9, 44}_2 ∧  b^{9, 44}_1 ∧  b^{9, 44}_0 ∧ true) 
c  in CNF:
c    -b^{9, 44}_2 ∨ -b^{9, 44}_1 ∨ -b^{9, 44}_0 ∨ false 
c  in DIMACS:
-10775 -10776 -10777  0

c i = 45
c  -2+1 --> -1
c    ( b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧  p_405) -> ( b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0)
c  in CNF:
c    -b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨  b^{9, 46}_2
c    -b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_1
c    -b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨  b^{9, 46}_0
c  in DIMACS:
-10778 -10779  10780 -405  10781 0
-10778 -10779  10780 -405 -10782 0
-10778 -10779  10780 -405  10783 0

c  -1+1 --> 0
c    ( b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0 ∧  p_405) -> (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧ -b^{9, 46}_0)
c  in CNF:
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_2
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_1
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_0
c  in DIMACS:
-10778  10779 -10780 -405 -10781 0
-10778  10779 -10780 -405 -10782 0
-10778  10779 -10780 -405 -10783 0

c  0+1 --> 1
c    (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧  p_405) -> (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0)
c  in CNF:
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_2
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_1
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨  b^{9, 46}_0
c  in DIMACS:
 10778  10779  10780 -405 -10781 0
 10778  10779  10780 -405 -10782 0
 10778  10779  10780 -405  10783 0

c  1+1 --> 2
c    (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0 ∧  p_405) -> (-b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0)
c  in CNF:
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_2
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨  b^{9, 46}_1
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ -p_405 ∨ -b^{9, 46}_0
c  in DIMACS:
 10778  10779 -10780 -405 -10781 0
 10778  10779 -10780 -405  10782 0
 10778  10779 -10780 -405 -10783 0

c  2+1 --> break 
c    (-b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧  p_405) -> break
c  in CNF:
c     b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 10778 -10779  10780 -405 1162 0


c  2-1 --> 1
c    (-b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧ -p_405) -> (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0)
c  in CNF:
c     b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_2
c     b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_1
c     b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨  b^{9, 46}_0
c  in DIMACS:
 10778 -10779  10780  405 -10781 0
 10778 -10779  10780  405 -10782 0
 10778 -10779  10780  405  10783 0

c  1-1 --> 0
c    (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0 ∧ -p_405) -> (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧ -b^{9, 46}_0)
c  in CNF:
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_2
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_1
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_0
c  in DIMACS:
 10778  10779 -10780  405 -10781 0
 10778  10779 -10780  405 -10782 0
 10778  10779 -10780  405 -10783 0

c  0-1 --> -1
c    (-b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧ -p_405) -> ( b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0)
c  in CNF:
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨  b^{9, 46}_2
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_1
c     b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨  b^{9, 46}_0
c  in DIMACS:
 10778  10779  10780  405  10781 0
 10778  10779  10780  405 -10782 0
 10778  10779  10780  405  10783 0

c  -1-1 --> -2
c    ( b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧  b^{9, 45}_0 ∧ -p_405) -> ( b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0)
c  in CNF:
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨  b^{9, 46}_2
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨  b^{9, 46}_1
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨  p_405 ∨ -b^{9, 46}_0
c  in DIMACS:
-10778  10779 -10780  405  10781 0
-10778  10779 -10780  405  10782 0
-10778  10779 -10780  405 -10783 0

c  -2-1 --> break 
c    ( b^{9, 45}_2 ∧  b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨  b^{9, 45}_0 ∨  p_405 ∨ break
c  in DIMACS:
-10778 -10779  10780  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 45}_2 ∧ -b^{9, 45}_1 ∧ -b^{9, 45}_0 ∧ true) 
c  in CNF:
c    -b^{9, 45}_2 ∨  b^{9, 45}_1 ∨  b^{9, 45}_0 ∨ false 
c  in DIMACS:
-10778  10779  10780  0

c  3 does not represent an automaton state.
c    -(-b^{9, 45}_2 ∧  b^{9, 45}_1 ∧  b^{9, 45}_0 ∧ true) 
c  in CNF:
c     b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ false 
c  in DIMACS:
 10778 -10779 -10780  0
c  -3 does not represent an automaton state.
c    -( b^{9, 45}_2 ∧  b^{9, 45}_1 ∧  b^{9, 45}_0 ∧ true) 
c  in CNF:
c    -b^{9, 45}_2 ∨ -b^{9, 45}_1 ∨ -b^{9, 45}_0 ∨ false 
c  in DIMACS:
-10778 -10779 -10780  0

c i = 46
c  -2+1 --> -1
c    ( b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧  p_414) -> ( b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0)
c  in CNF:
c    -b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨  b^{9, 47}_2
c    -b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_1
c    -b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨  b^{9, 47}_0
c  in DIMACS:
-10781 -10782  10783 -414  10784 0
-10781 -10782  10783 -414 -10785 0
-10781 -10782  10783 -414  10786 0

c  -1+1 --> 0
c    ( b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0 ∧  p_414) -> (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧ -b^{9, 47}_0)
c  in CNF:
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_2
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_1
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_0
c  in DIMACS:
-10781  10782 -10783 -414 -10784 0
-10781  10782 -10783 -414 -10785 0
-10781  10782 -10783 -414 -10786 0

c  0+1 --> 1
c    (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧  p_414) -> (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0)
c  in CNF:
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_2
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_1
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨  b^{9, 47}_0
c  in DIMACS:
 10781  10782  10783 -414 -10784 0
 10781  10782  10783 -414 -10785 0
 10781  10782  10783 -414  10786 0

c  1+1 --> 2
c    (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0 ∧  p_414) -> (-b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0)
c  in CNF:
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_2
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨  b^{9, 47}_1
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ -p_414 ∨ -b^{9, 47}_0
c  in DIMACS:
 10781  10782 -10783 -414 -10784 0
 10781  10782 -10783 -414  10785 0
 10781  10782 -10783 -414 -10786 0

c  2+1 --> break 
c    (-b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧  p_414) -> break
c  in CNF:
c     b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 10781 -10782  10783 -414 1162 0


c  2-1 --> 1
c    (-b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧ -p_414) -> (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0)
c  in CNF:
c     b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_2
c     b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_1
c     b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨  b^{9, 47}_0
c  in DIMACS:
 10781 -10782  10783  414 -10784 0
 10781 -10782  10783  414 -10785 0
 10781 -10782  10783  414  10786 0

c  1-1 --> 0
c    (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0 ∧ -p_414) -> (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧ -b^{9, 47}_0)
c  in CNF:
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_2
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_1
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_0
c  in DIMACS:
 10781  10782 -10783  414 -10784 0
 10781  10782 -10783  414 -10785 0
 10781  10782 -10783  414 -10786 0

c  0-1 --> -1
c    (-b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧ -p_414) -> ( b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0)
c  in CNF:
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨  b^{9, 47}_2
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_1
c     b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨  b^{9, 47}_0
c  in DIMACS:
 10781  10782  10783  414  10784 0
 10781  10782  10783  414 -10785 0
 10781  10782  10783  414  10786 0

c  -1-1 --> -2
c    ( b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧  b^{9, 46}_0 ∧ -p_414) -> ( b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0)
c  in CNF:
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨  b^{9, 47}_2
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨  b^{9, 47}_1
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨  p_414 ∨ -b^{9, 47}_0
c  in DIMACS:
-10781  10782 -10783  414  10784 0
-10781  10782 -10783  414  10785 0
-10781  10782 -10783  414 -10786 0

c  -2-1 --> break 
c    ( b^{9, 46}_2 ∧  b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨  b^{9, 46}_0 ∨  p_414 ∨ break
c  in DIMACS:
-10781 -10782  10783  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 46}_2 ∧ -b^{9, 46}_1 ∧ -b^{9, 46}_0 ∧ true) 
c  in CNF:
c    -b^{9, 46}_2 ∨  b^{9, 46}_1 ∨  b^{9, 46}_0 ∨ false 
c  in DIMACS:
-10781  10782  10783  0

c  3 does not represent an automaton state.
c    -(-b^{9, 46}_2 ∧  b^{9, 46}_1 ∧  b^{9, 46}_0 ∧ true) 
c  in CNF:
c     b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ false 
c  in DIMACS:
 10781 -10782 -10783  0
c  -3 does not represent an automaton state.
c    -( b^{9, 46}_2 ∧  b^{9, 46}_1 ∧  b^{9, 46}_0 ∧ true) 
c  in CNF:
c    -b^{9, 46}_2 ∨ -b^{9, 46}_1 ∨ -b^{9, 46}_0 ∨ false 
c  in DIMACS:
-10781 -10782 -10783  0

c i = 47
c  -2+1 --> -1
c    ( b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧  p_423) -> ( b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0)
c  in CNF:
c    -b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨  b^{9, 48}_2
c    -b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_1
c    -b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨  b^{9, 48}_0
c  in DIMACS:
-10784 -10785  10786 -423  10787 0
-10784 -10785  10786 -423 -10788 0
-10784 -10785  10786 -423  10789 0

c  -1+1 --> 0
c    ( b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0 ∧  p_423) -> (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧ -b^{9, 48}_0)
c  in CNF:
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_2
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_1
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_0
c  in DIMACS:
-10784  10785 -10786 -423 -10787 0
-10784  10785 -10786 -423 -10788 0
-10784  10785 -10786 -423 -10789 0

c  0+1 --> 1
c    (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧  p_423) -> (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0)
c  in CNF:
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_2
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_1
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨  b^{9, 48}_0
c  in DIMACS:
 10784  10785  10786 -423 -10787 0
 10784  10785  10786 -423 -10788 0
 10784  10785  10786 -423  10789 0

c  1+1 --> 2
c    (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0 ∧  p_423) -> (-b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0)
c  in CNF:
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_2
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨  b^{9, 48}_1
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ -p_423 ∨ -b^{9, 48}_0
c  in DIMACS:
 10784  10785 -10786 -423 -10787 0
 10784  10785 -10786 -423  10788 0
 10784  10785 -10786 -423 -10789 0

c  2+1 --> break 
c    (-b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧  p_423) -> break
c  in CNF:
c     b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ -p_423 ∨ break
c  in DIMACS:
 10784 -10785  10786 -423 1162 0


c  2-1 --> 1
c    (-b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧ -p_423) -> (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0)
c  in CNF:
c     b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_2
c     b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_1
c     b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨  b^{9, 48}_0
c  in DIMACS:
 10784 -10785  10786  423 -10787 0
 10784 -10785  10786  423 -10788 0
 10784 -10785  10786  423  10789 0

c  1-1 --> 0
c    (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0 ∧ -p_423) -> (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧ -b^{9, 48}_0)
c  in CNF:
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_2
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_1
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_0
c  in DIMACS:
 10784  10785 -10786  423 -10787 0
 10784  10785 -10786  423 -10788 0
 10784  10785 -10786  423 -10789 0

c  0-1 --> -1
c    (-b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧ -p_423) -> ( b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0)
c  in CNF:
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨  b^{9, 48}_2
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_1
c     b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨  b^{9, 48}_0
c  in DIMACS:
 10784  10785  10786  423  10787 0
 10784  10785  10786  423 -10788 0
 10784  10785  10786  423  10789 0

c  -1-1 --> -2
c    ( b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧  b^{9, 47}_0 ∧ -p_423) -> ( b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0)
c  in CNF:
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨  b^{9, 48}_2
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨  b^{9, 48}_1
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨  p_423 ∨ -b^{9, 48}_0
c  in DIMACS:
-10784  10785 -10786  423  10787 0
-10784  10785 -10786  423  10788 0
-10784  10785 -10786  423 -10789 0

c  -2-1 --> break 
c    ( b^{9, 47}_2 ∧  b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧ -p_423) -> break
c  in CNF:
c    -b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨  b^{9, 47}_0 ∨  p_423 ∨ break
c  in DIMACS:
-10784 -10785  10786  423 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 47}_2 ∧ -b^{9, 47}_1 ∧ -b^{9, 47}_0 ∧ true) 
c  in CNF:
c    -b^{9, 47}_2 ∨  b^{9, 47}_1 ∨  b^{9, 47}_0 ∨ false 
c  in DIMACS:
-10784  10785  10786  0

c  3 does not represent an automaton state.
c    -(-b^{9, 47}_2 ∧  b^{9, 47}_1 ∧  b^{9, 47}_0 ∧ true) 
c  in CNF:
c     b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ false 
c  in DIMACS:
 10784 -10785 -10786  0
c  -3 does not represent an automaton state.
c    -( b^{9, 47}_2 ∧  b^{9, 47}_1 ∧  b^{9, 47}_0 ∧ true) 
c  in CNF:
c    -b^{9, 47}_2 ∨ -b^{9, 47}_1 ∨ -b^{9, 47}_0 ∨ false 
c  in DIMACS:
-10784 -10785 -10786  0

c i = 48
c  -2+1 --> -1
c    ( b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧  p_432) -> ( b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0)
c  in CNF:
c    -b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨  b^{9, 49}_2
c    -b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_1
c    -b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨  b^{9, 49}_0
c  in DIMACS:
-10787 -10788  10789 -432  10790 0
-10787 -10788  10789 -432 -10791 0
-10787 -10788  10789 -432  10792 0

c  -1+1 --> 0
c    ( b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0 ∧  p_432) -> (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧ -b^{9, 49}_0)
c  in CNF:
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_2
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_1
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_0
c  in DIMACS:
-10787  10788 -10789 -432 -10790 0
-10787  10788 -10789 -432 -10791 0
-10787  10788 -10789 -432 -10792 0

c  0+1 --> 1
c    (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧  p_432) -> (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0)
c  in CNF:
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_2
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_1
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨  b^{9, 49}_0
c  in DIMACS:
 10787  10788  10789 -432 -10790 0
 10787  10788  10789 -432 -10791 0
 10787  10788  10789 -432  10792 0

c  1+1 --> 2
c    (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0 ∧  p_432) -> (-b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0)
c  in CNF:
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_2
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨  b^{9, 49}_1
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ -p_432 ∨ -b^{9, 49}_0
c  in DIMACS:
 10787  10788 -10789 -432 -10790 0
 10787  10788 -10789 -432  10791 0
 10787  10788 -10789 -432 -10792 0

c  2+1 --> break 
c    (-b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧  p_432) -> break
c  in CNF:
c     b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 10787 -10788  10789 -432 1162 0


c  2-1 --> 1
c    (-b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧ -p_432) -> (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0)
c  in CNF:
c     b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_2
c     b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_1
c     b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨  b^{9, 49}_0
c  in DIMACS:
 10787 -10788  10789  432 -10790 0
 10787 -10788  10789  432 -10791 0
 10787 -10788  10789  432  10792 0

c  1-1 --> 0
c    (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0 ∧ -p_432) -> (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧ -b^{9, 49}_0)
c  in CNF:
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_2
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_1
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_0
c  in DIMACS:
 10787  10788 -10789  432 -10790 0
 10787  10788 -10789  432 -10791 0
 10787  10788 -10789  432 -10792 0

c  0-1 --> -1
c    (-b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧ -p_432) -> ( b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0)
c  in CNF:
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨  b^{9, 49}_2
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_1
c     b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨  b^{9, 49}_0
c  in DIMACS:
 10787  10788  10789  432  10790 0
 10787  10788  10789  432 -10791 0
 10787  10788  10789  432  10792 0

c  -1-1 --> -2
c    ( b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧  b^{9, 48}_0 ∧ -p_432) -> ( b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0)
c  in CNF:
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨  b^{9, 49}_2
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨  b^{9, 49}_1
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨  p_432 ∨ -b^{9, 49}_0
c  in DIMACS:
-10787  10788 -10789  432  10790 0
-10787  10788 -10789  432  10791 0
-10787  10788 -10789  432 -10792 0

c  -2-1 --> break 
c    ( b^{9, 48}_2 ∧  b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨  b^{9, 48}_0 ∨  p_432 ∨ break
c  in DIMACS:
-10787 -10788  10789  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 48}_2 ∧ -b^{9, 48}_1 ∧ -b^{9, 48}_0 ∧ true) 
c  in CNF:
c    -b^{9, 48}_2 ∨  b^{9, 48}_1 ∨  b^{9, 48}_0 ∨ false 
c  in DIMACS:
-10787  10788  10789  0

c  3 does not represent an automaton state.
c    -(-b^{9, 48}_2 ∧  b^{9, 48}_1 ∧  b^{9, 48}_0 ∧ true) 
c  in CNF:
c     b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ false 
c  in DIMACS:
 10787 -10788 -10789  0
c  -3 does not represent an automaton state.
c    -( b^{9, 48}_2 ∧  b^{9, 48}_1 ∧  b^{9, 48}_0 ∧ true) 
c  in CNF:
c    -b^{9, 48}_2 ∨ -b^{9, 48}_1 ∨ -b^{9, 48}_0 ∨ false 
c  in DIMACS:
-10787 -10788 -10789  0

c i = 49
c  -2+1 --> -1
c    ( b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧  p_441) -> ( b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0)
c  in CNF:
c    -b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨  b^{9, 50}_2
c    -b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_1
c    -b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨  b^{9, 50}_0
c  in DIMACS:
-10790 -10791  10792 -441  10793 0
-10790 -10791  10792 -441 -10794 0
-10790 -10791  10792 -441  10795 0

c  -1+1 --> 0
c    ( b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0 ∧  p_441) -> (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧ -b^{9, 50}_0)
c  in CNF:
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_2
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_1
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_0
c  in DIMACS:
-10790  10791 -10792 -441 -10793 0
-10790  10791 -10792 -441 -10794 0
-10790  10791 -10792 -441 -10795 0

c  0+1 --> 1
c    (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧  p_441) -> (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0)
c  in CNF:
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_2
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_1
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨  b^{9, 50}_0
c  in DIMACS:
 10790  10791  10792 -441 -10793 0
 10790  10791  10792 -441 -10794 0
 10790  10791  10792 -441  10795 0

c  1+1 --> 2
c    (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0 ∧  p_441) -> (-b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0)
c  in CNF:
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_2
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨  b^{9, 50}_1
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ -p_441 ∨ -b^{9, 50}_0
c  in DIMACS:
 10790  10791 -10792 -441 -10793 0
 10790  10791 -10792 -441  10794 0
 10790  10791 -10792 -441 -10795 0

c  2+1 --> break 
c    (-b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧  p_441) -> break
c  in CNF:
c     b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 10790 -10791  10792 -441 1162 0


c  2-1 --> 1
c    (-b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧ -p_441) -> (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0)
c  in CNF:
c     b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_2
c     b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_1
c     b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨  b^{9, 50}_0
c  in DIMACS:
 10790 -10791  10792  441 -10793 0
 10790 -10791  10792  441 -10794 0
 10790 -10791  10792  441  10795 0

c  1-1 --> 0
c    (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0 ∧ -p_441) -> (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧ -b^{9, 50}_0)
c  in CNF:
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_2
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_1
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_0
c  in DIMACS:
 10790  10791 -10792  441 -10793 0
 10790  10791 -10792  441 -10794 0
 10790  10791 -10792  441 -10795 0

c  0-1 --> -1
c    (-b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧ -p_441) -> ( b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0)
c  in CNF:
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨  b^{9, 50}_2
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_1
c     b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨  b^{9, 50}_0
c  in DIMACS:
 10790  10791  10792  441  10793 0
 10790  10791  10792  441 -10794 0
 10790  10791  10792  441  10795 0

c  -1-1 --> -2
c    ( b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧  b^{9, 49}_0 ∧ -p_441) -> ( b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0)
c  in CNF:
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨  b^{9, 50}_2
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨  b^{9, 50}_1
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨  p_441 ∨ -b^{9, 50}_0
c  in DIMACS:
-10790  10791 -10792  441  10793 0
-10790  10791 -10792  441  10794 0
-10790  10791 -10792  441 -10795 0

c  -2-1 --> break 
c    ( b^{9, 49}_2 ∧  b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨  b^{9, 49}_0 ∨  p_441 ∨ break
c  in DIMACS:
-10790 -10791  10792  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 49}_2 ∧ -b^{9, 49}_1 ∧ -b^{9, 49}_0 ∧ true) 
c  in CNF:
c    -b^{9, 49}_2 ∨  b^{9, 49}_1 ∨  b^{9, 49}_0 ∨ false 
c  in DIMACS:
-10790  10791  10792  0

c  3 does not represent an automaton state.
c    -(-b^{9, 49}_2 ∧  b^{9, 49}_1 ∧  b^{9, 49}_0 ∧ true) 
c  in CNF:
c     b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ false 
c  in DIMACS:
 10790 -10791 -10792  0
c  -3 does not represent an automaton state.
c    -( b^{9, 49}_2 ∧  b^{9, 49}_1 ∧  b^{9, 49}_0 ∧ true) 
c  in CNF:
c    -b^{9, 49}_2 ∨ -b^{9, 49}_1 ∨ -b^{9, 49}_0 ∨ false 
c  in DIMACS:
-10790 -10791 -10792  0

c i = 50
c  -2+1 --> -1
c    ( b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧  p_450) -> ( b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0)
c  in CNF:
c    -b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨  b^{9, 51}_2
c    -b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_1
c    -b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨  b^{9, 51}_0
c  in DIMACS:
-10793 -10794  10795 -450  10796 0
-10793 -10794  10795 -450 -10797 0
-10793 -10794  10795 -450  10798 0

c  -1+1 --> 0
c    ( b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0 ∧  p_450) -> (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧ -b^{9, 51}_0)
c  in CNF:
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_2
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_1
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_0
c  in DIMACS:
-10793  10794 -10795 -450 -10796 0
-10793  10794 -10795 -450 -10797 0
-10793  10794 -10795 -450 -10798 0

c  0+1 --> 1
c    (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧  p_450) -> (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0)
c  in CNF:
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_2
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_1
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨  b^{9, 51}_0
c  in DIMACS:
 10793  10794  10795 -450 -10796 0
 10793  10794  10795 -450 -10797 0
 10793  10794  10795 -450  10798 0

c  1+1 --> 2
c    (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0 ∧  p_450) -> (-b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0)
c  in CNF:
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_2
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨  b^{9, 51}_1
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ -p_450 ∨ -b^{9, 51}_0
c  in DIMACS:
 10793  10794 -10795 -450 -10796 0
 10793  10794 -10795 -450  10797 0
 10793  10794 -10795 -450 -10798 0

c  2+1 --> break 
c    (-b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧  p_450) -> break
c  in CNF:
c     b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 10793 -10794  10795 -450 1162 0


c  2-1 --> 1
c    (-b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧ -p_450) -> (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0)
c  in CNF:
c     b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_2
c     b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_1
c     b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨  b^{9, 51}_0
c  in DIMACS:
 10793 -10794  10795  450 -10796 0
 10793 -10794  10795  450 -10797 0
 10793 -10794  10795  450  10798 0

c  1-1 --> 0
c    (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0 ∧ -p_450) -> (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧ -b^{9, 51}_0)
c  in CNF:
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_2
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_1
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_0
c  in DIMACS:
 10793  10794 -10795  450 -10796 0
 10793  10794 -10795  450 -10797 0
 10793  10794 -10795  450 -10798 0

c  0-1 --> -1
c    (-b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧ -p_450) -> ( b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0)
c  in CNF:
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨  b^{9, 51}_2
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_1
c     b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨  b^{9, 51}_0
c  in DIMACS:
 10793  10794  10795  450  10796 0
 10793  10794  10795  450 -10797 0
 10793  10794  10795  450  10798 0

c  -1-1 --> -2
c    ( b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧  b^{9, 50}_0 ∧ -p_450) -> ( b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0)
c  in CNF:
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨  b^{9, 51}_2
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨  b^{9, 51}_1
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨  p_450 ∨ -b^{9, 51}_0
c  in DIMACS:
-10793  10794 -10795  450  10796 0
-10793  10794 -10795  450  10797 0
-10793  10794 -10795  450 -10798 0

c  -2-1 --> break 
c    ( b^{9, 50}_2 ∧  b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨  b^{9, 50}_0 ∨  p_450 ∨ break
c  in DIMACS:
-10793 -10794  10795  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 50}_2 ∧ -b^{9, 50}_1 ∧ -b^{9, 50}_0 ∧ true) 
c  in CNF:
c    -b^{9, 50}_2 ∨  b^{9, 50}_1 ∨  b^{9, 50}_0 ∨ false 
c  in DIMACS:
-10793  10794  10795  0

c  3 does not represent an automaton state.
c    -(-b^{9, 50}_2 ∧  b^{9, 50}_1 ∧  b^{9, 50}_0 ∧ true) 
c  in CNF:
c     b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ false 
c  in DIMACS:
 10793 -10794 -10795  0
c  -3 does not represent an automaton state.
c    -( b^{9, 50}_2 ∧  b^{9, 50}_1 ∧  b^{9, 50}_0 ∧ true) 
c  in CNF:
c    -b^{9, 50}_2 ∨ -b^{9, 50}_1 ∨ -b^{9, 50}_0 ∨ false 
c  in DIMACS:
-10793 -10794 -10795  0

c i = 51
c  -2+1 --> -1
c    ( b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧  p_459) -> ( b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0)
c  in CNF:
c    -b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨  b^{9, 52}_2
c    -b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_1
c    -b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨  b^{9, 52}_0
c  in DIMACS:
-10796 -10797  10798 -459  10799 0
-10796 -10797  10798 -459 -10800 0
-10796 -10797  10798 -459  10801 0

c  -1+1 --> 0
c    ( b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0 ∧  p_459) -> (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧ -b^{9, 52}_0)
c  in CNF:
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_2
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_1
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_0
c  in DIMACS:
-10796  10797 -10798 -459 -10799 0
-10796  10797 -10798 -459 -10800 0
-10796  10797 -10798 -459 -10801 0

c  0+1 --> 1
c    (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧  p_459) -> (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0)
c  in CNF:
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_2
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_1
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨  b^{9, 52}_0
c  in DIMACS:
 10796  10797  10798 -459 -10799 0
 10796  10797  10798 -459 -10800 0
 10796  10797  10798 -459  10801 0

c  1+1 --> 2
c    (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0 ∧  p_459) -> (-b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0)
c  in CNF:
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_2
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨  b^{9, 52}_1
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ -p_459 ∨ -b^{9, 52}_0
c  in DIMACS:
 10796  10797 -10798 -459 -10799 0
 10796  10797 -10798 -459  10800 0
 10796  10797 -10798 -459 -10801 0

c  2+1 --> break 
c    (-b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧  p_459) -> break
c  in CNF:
c     b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 10796 -10797  10798 -459 1162 0


c  2-1 --> 1
c    (-b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧ -p_459) -> (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0)
c  in CNF:
c     b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_2
c     b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_1
c     b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨  b^{9, 52}_0
c  in DIMACS:
 10796 -10797  10798  459 -10799 0
 10796 -10797  10798  459 -10800 0
 10796 -10797  10798  459  10801 0

c  1-1 --> 0
c    (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0 ∧ -p_459) -> (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧ -b^{9, 52}_0)
c  in CNF:
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_2
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_1
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_0
c  in DIMACS:
 10796  10797 -10798  459 -10799 0
 10796  10797 -10798  459 -10800 0
 10796  10797 -10798  459 -10801 0

c  0-1 --> -1
c    (-b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧ -p_459) -> ( b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0)
c  in CNF:
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨  b^{9, 52}_2
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_1
c     b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨  b^{9, 52}_0
c  in DIMACS:
 10796  10797  10798  459  10799 0
 10796  10797  10798  459 -10800 0
 10796  10797  10798  459  10801 0

c  -1-1 --> -2
c    ( b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧  b^{9, 51}_0 ∧ -p_459) -> ( b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0)
c  in CNF:
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨  b^{9, 52}_2
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨  b^{9, 52}_1
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨  p_459 ∨ -b^{9, 52}_0
c  in DIMACS:
-10796  10797 -10798  459  10799 0
-10796  10797 -10798  459  10800 0
-10796  10797 -10798  459 -10801 0

c  -2-1 --> break 
c    ( b^{9, 51}_2 ∧  b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨  b^{9, 51}_0 ∨  p_459 ∨ break
c  in DIMACS:
-10796 -10797  10798  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 51}_2 ∧ -b^{9, 51}_1 ∧ -b^{9, 51}_0 ∧ true) 
c  in CNF:
c    -b^{9, 51}_2 ∨  b^{9, 51}_1 ∨  b^{9, 51}_0 ∨ false 
c  in DIMACS:
-10796  10797  10798  0

c  3 does not represent an automaton state.
c    -(-b^{9, 51}_2 ∧  b^{9, 51}_1 ∧  b^{9, 51}_0 ∧ true) 
c  in CNF:
c     b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ false 
c  in DIMACS:
 10796 -10797 -10798  0
c  -3 does not represent an automaton state.
c    -( b^{9, 51}_2 ∧  b^{9, 51}_1 ∧  b^{9, 51}_0 ∧ true) 
c  in CNF:
c    -b^{9, 51}_2 ∨ -b^{9, 51}_1 ∨ -b^{9, 51}_0 ∨ false 
c  in DIMACS:
-10796 -10797 -10798  0

c i = 52
c  -2+1 --> -1
c    ( b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧  p_468) -> ( b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0)
c  in CNF:
c    -b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨  b^{9, 53}_2
c    -b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_1
c    -b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨  b^{9, 53}_0
c  in DIMACS:
-10799 -10800  10801 -468  10802 0
-10799 -10800  10801 -468 -10803 0
-10799 -10800  10801 -468  10804 0

c  -1+1 --> 0
c    ( b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0 ∧  p_468) -> (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧ -b^{9, 53}_0)
c  in CNF:
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_2
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_1
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_0
c  in DIMACS:
-10799  10800 -10801 -468 -10802 0
-10799  10800 -10801 -468 -10803 0
-10799  10800 -10801 -468 -10804 0

c  0+1 --> 1
c    (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧  p_468) -> (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0)
c  in CNF:
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_2
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_1
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨  b^{9, 53}_0
c  in DIMACS:
 10799  10800  10801 -468 -10802 0
 10799  10800  10801 -468 -10803 0
 10799  10800  10801 -468  10804 0

c  1+1 --> 2
c    (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0 ∧  p_468) -> (-b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0)
c  in CNF:
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_2
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨  b^{9, 53}_1
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ -p_468 ∨ -b^{9, 53}_0
c  in DIMACS:
 10799  10800 -10801 -468 -10802 0
 10799  10800 -10801 -468  10803 0
 10799  10800 -10801 -468 -10804 0

c  2+1 --> break 
c    (-b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧  p_468) -> break
c  in CNF:
c     b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 10799 -10800  10801 -468 1162 0


c  2-1 --> 1
c    (-b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧ -p_468) -> (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0)
c  in CNF:
c     b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_2
c     b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_1
c     b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨  b^{9, 53}_0
c  in DIMACS:
 10799 -10800  10801  468 -10802 0
 10799 -10800  10801  468 -10803 0
 10799 -10800  10801  468  10804 0

c  1-1 --> 0
c    (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0 ∧ -p_468) -> (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧ -b^{9, 53}_0)
c  in CNF:
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_2
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_1
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_0
c  in DIMACS:
 10799  10800 -10801  468 -10802 0
 10799  10800 -10801  468 -10803 0
 10799  10800 -10801  468 -10804 0

c  0-1 --> -1
c    (-b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧ -p_468) -> ( b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0)
c  in CNF:
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨  b^{9, 53}_2
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_1
c     b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨  b^{9, 53}_0
c  in DIMACS:
 10799  10800  10801  468  10802 0
 10799  10800  10801  468 -10803 0
 10799  10800  10801  468  10804 0

c  -1-1 --> -2
c    ( b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧  b^{9, 52}_0 ∧ -p_468) -> ( b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0)
c  in CNF:
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨  b^{9, 53}_2
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨  b^{9, 53}_1
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨  p_468 ∨ -b^{9, 53}_0
c  in DIMACS:
-10799  10800 -10801  468  10802 0
-10799  10800 -10801  468  10803 0
-10799  10800 -10801  468 -10804 0

c  -2-1 --> break 
c    ( b^{9, 52}_2 ∧  b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨  b^{9, 52}_0 ∨  p_468 ∨ break
c  in DIMACS:
-10799 -10800  10801  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 52}_2 ∧ -b^{9, 52}_1 ∧ -b^{9, 52}_0 ∧ true) 
c  in CNF:
c    -b^{9, 52}_2 ∨  b^{9, 52}_1 ∨  b^{9, 52}_0 ∨ false 
c  in DIMACS:
-10799  10800  10801  0

c  3 does not represent an automaton state.
c    -(-b^{9, 52}_2 ∧  b^{9, 52}_1 ∧  b^{9, 52}_0 ∧ true) 
c  in CNF:
c     b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ false 
c  in DIMACS:
 10799 -10800 -10801  0
c  -3 does not represent an automaton state.
c    -( b^{9, 52}_2 ∧  b^{9, 52}_1 ∧  b^{9, 52}_0 ∧ true) 
c  in CNF:
c    -b^{9, 52}_2 ∨ -b^{9, 52}_1 ∨ -b^{9, 52}_0 ∨ false 
c  in DIMACS:
-10799 -10800 -10801  0

c i = 53
c  -2+1 --> -1
c    ( b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧  p_477) -> ( b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0)
c  in CNF:
c    -b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨  b^{9, 54}_2
c    -b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_1
c    -b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨  b^{9, 54}_0
c  in DIMACS:
-10802 -10803  10804 -477  10805 0
-10802 -10803  10804 -477 -10806 0
-10802 -10803  10804 -477  10807 0

c  -1+1 --> 0
c    ( b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0 ∧  p_477) -> (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧ -b^{9, 54}_0)
c  in CNF:
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_2
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_1
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_0
c  in DIMACS:
-10802  10803 -10804 -477 -10805 0
-10802  10803 -10804 -477 -10806 0
-10802  10803 -10804 -477 -10807 0

c  0+1 --> 1
c    (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧  p_477) -> (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0)
c  in CNF:
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_2
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_1
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨  b^{9, 54}_0
c  in DIMACS:
 10802  10803  10804 -477 -10805 0
 10802  10803  10804 -477 -10806 0
 10802  10803  10804 -477  10807 0

c  1+1 --> 2
c    (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0 ∧  p_477) -> (-b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0)
c  in CNF:
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_2
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨  b^{9, 54}_1
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ -p_477 ∨ -b^{9, 54}_0
c  in DIMACS:
 10802  10803 -10804 -477 -10805 0
 10802  10803 -10804 -477  10806 0
 10802  10803 -10804 -477 -10807 0

c  2+1 --> break 
c    (-b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧  p_477) -> break
c  in CNF:
c     b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ -p_477 ∨ break
c  in DIMACS:
 10802 -10803  10804 -477 1162 0


c  2-1 --> 1
c    (-b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧ -p_477) -> (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0)
c  in CNF:
c     b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_2
c     b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_1
c     b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨  b^{9, 54}_0
c  in DIMACS:
 10802 -10803  10804  477 -10805 0
 10802 -10803  10804  477 -10806 0
 10802 -10803  10804  477  10807 0

c  1-1 --> 0
c    (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0 ∧ -p_477) -> (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧ -b^{9, 54}_0)
c  in CNF:
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_2
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_1
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_0
c  in DIMACS:
 10802  10803 -10804  477 -10805 0
 10802  10803 -10804  477 -10806 0
 10802  10803 -10804  477 -10807 0

c  0-1 --> -1
c    (-b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧ -p_477) -> ( b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0)
c  in CNF:
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨  b^{9, 54}_2
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_1
c     b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨  b^{9, 54}_0
c  in DIMACS:
 10802  10803  10804  477  10805 0
 10802  10803  10804  477 -10806 0
 10802  10803  10804  477  10807 0

c  -1-1 --> -2
c    ( b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧  b^{9, 53}_0 ∧ -p_477) -> ( b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0)
c  in CNF:
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨  b^{9, 54}_2
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨  b^{9, 54}_1
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨  p_477 ∨ -b^{9, 54}_0
c  in DIMACS:
-10802  10803 -10804  477  10805 0
-10802  10803 -10804  477  10806 0
-10802  10803 -10804  477 -10807 0

c  -2-1 --> break 
c    ( b^{9, 53}_2 ∧  b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧ -p_477) -> break
c  in CNF:
c    -b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨  b^{9, 53}_0 ∨  p_477 ∨ break
c  in DIMACS:
-10802 -10803  10804  477 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 53}_2 ∧ -b^{9, 53}_1 ∧ -b^{9, 53}_0 ∧ true) 
c  in CNF:
c    -b^{9, 53}_2 ∨  b^{9, 53}_1 ∨  b^{9, 53}_0 ∨ false 
c  in DIMACS:
-10802  10803  10804  0

c  3 does not represent an automaton state.
c    -(-b^{9, 53}_2 ∧  b^{9, 53}_1 ∧  b^{9, 53}_0 ∧ true) 
c  in CNF:
c     b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ false 
c  in DIMACS:
 10802 -10803 -10804  0
c  -3 does not represent an automaton state.
c    -( b^{9, 53}_2 ∧  b^{9, 53}_1 ∧  b^{9, 53}_0 ∧ true) 
c  in CNF:
c    -b^{9, 53}_2 ∨ -b^{9, 53}_1 ∨ -b^{9, 53}_0 ∨ false 
c  in DIMACS:
-10802 -10803 -10804  0

c i = 54
c  -2+1 --> -1
c    ( b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧  p_486) -> ( b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0)
c  in CNF:
c    -b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨  b^{9, 55}_2
c    -b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_1
c    -b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨  b^{9, 55}_0
c  in DIMACS:
-10805 -10806  10807 -486  10808 0
-10805 -10806  10807 -486 -10809 0
-10805 -10806  10807 -486  10810 0

c  -1+1 --> 0
c    ( b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0 ∧  p_486) -> (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧ -b^{9, 55}_0)
c  in CNF:
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_2
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_1
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_0
c  in DIMACS:
-10805  10806 -10807 -486 -10808 0
-10805  10806 -10807 -486 -10809 0
-10805  10806 -10807 -486 -10810 0

c  0+1 --> 1
c    (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧  p_486) -> (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0)
c  in CNF:
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_2
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_1
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨  b^{9, 55}_0
c  in DIMACS:
 10805  10806  10807 -486 -10808 0
 10805  10806  10807 -486 -10809 0
 10805  10806  10807 -486  10810 0

c  1+1 --> 2
c    (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0 ∧  p_486) -> (-b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0)
c  in CNF:
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_2
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨  b^{9, 55}_1
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ -p_486 ∨ -b^{9, 55}_0
c  in DIMACS:
 10805  10806 -10807 -486 -10808 0
 10805  10806 -10807 -486  10809 0
 10805  10806 -10807 -486 -10810 0

c  2+1 --> break 
c    (-b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧  p_486) -> break
c  in CNF:
c     b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 10805 -10806  10807 -486 1162 0


c  2-1 --> 1
c    (-b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧ -p_486) -> (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0)
c  in CNF:
c     b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_2
c     b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_1
c     b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨  b^{9, 55}_0
c  in DIMACS:
 10805 -10806  10807  486 -10808 0
 10805 -10806  10807  486 -10809 0
 10805 -10806  10807  486  10810 0

c  1-1 --> 0
c    (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0 ∧ -p_486) -> (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧ -b^{9, 55}_0)
c  in CNF:
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_2
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_1
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_0
c  in DIMACS:
 10805  10806 -10807  486 -10808 0
 10805  10806 -10807  486 -10809 0
 10805  10806 -10807  486 -10810 0

c  0-1 --> -1
c    (-b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧ -p_486) -> ( b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0)
c  in CNF:
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨  b^{9, 55}_2
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_1
c     b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨  b^{9, 55}_0
c  in DIMACS:
 10805  10806  10807  486  10808 0
 10805  10806  10807  486 -10809 0
 10805  10806  10807  486  10810 0

c  -1-1 --> -2
c    ( b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧  b^{9, 54}_0 ∧ -p_486) -> ( b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0)
c  in CNF:
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨  b^{9, 55}_2
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨  b^{9, 55}_1
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨  p_486 ∨ -b^{9, 55}_0
c  in DIMACS:
-10805  10806 -10807  486  10808 0
-10805  10806 -10807  486  10809 0
-10805  10806 -10807  486 -10810 0

c  -2-1 --> break 
c    ( b^{9, 54}_2 ∧  b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨  b^{9, 54}_0 ∨  p_486 ∨ break
c  in DIMACS:
-10805 -10806  10807  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 54}_2 ∧ -b^{9, 54}_1 ∧ -b^{9, 54}_0 ∧ true) 
c  in CNF:
c    -b^{9, 54}_2 ∨  b^{9, 54}_1 ∨  b^{9, 54}_0 ∨ false 
c  in DIMACS:
-10805  10806  10807  0

c  3 does not represent an automaton state.
c    -(-b^{9, 54}_2 ∧  b^{9, 54}_1 ∧  b^{9, 54}_0 ∧ true) 
c  in CNF:
c     b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ false 
c  in DIMACS:
 10805 -10806 -10807  0
c  -3 does not represent an automaton state.
c    -( b^{9, 54}_2 ∧  b^{9, 54}_1 ∧  b^{9, 54}_0 ∧ true) 
c  in CNF:
c    -b^{9, 54}_2 ∨ -b^{9, 54}_1 ∨ -b^{9, 54}_0 ∨ false 
c  in DIMACS:
-10805 -10806 -10807  0

c i = 55
c  -2+1 --> -1
c    ( b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧  p_495) -> ( b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0)
c  in CNF:
c    -b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨  b^{9, 56}_2
c    -b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_1
c    -b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨  b^{9, 56}_0
c  in DIMACS:
-10808 -10809  10810 -495  10811 0
-10808 -10809  10810 -495 -10812 0
-10808 -10809  10810 -495  10813 0

c  -1+1 --> 0
c    ( b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0 ∧  p_495) -> (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧ -b^{9, 56}_0)
c  in CNF:
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_2
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_1
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_0
c  in DIMACS:
-10808  10809 -10810 -495 -10811 0
-10808  10809 -10810 -495 -10812 0
-10808  10809 -10810 -495 -10813 0

c  0+1 --> 1
c    (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧  p_495) -> (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0)
c  in CNF:
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_2
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_1
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨  b^{9, 56}_0
c  in DIMACS:
 10808  10809  10810 -495 -10811 0
 10808  10809  10810 -495 -10812 0
 10808  10809  10810 -495  10813 0

c  1+1 --> 2
c    (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0 ∧  p_495) -> (-b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0)
c  in CNF:
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_2
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨  b^{9, 56}_1
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ -p_495 ∨ -b^{9, 56}_0
c  in DIMACS:
 10808  10809 -10810 -495 -10811 0
 10808  10809 -10810 -495  10812 0
 10808  10809 -10810 -495 -10813 0

c  2+1 --> break 
c    (-b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧  p_495) -> break
c  in CNF:
c     b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 10808 -10809  10810 -495 1162 0


c  2-1 --> 1
c    (-b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧ -p_495) -> (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0)
c  in CNF:
c     b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_2
c     b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_1
c     b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨  b^{9, 56}_0
c  in DIMACS:
 10808 -10809  10810  495 -10811 0
 10808 -10809  10810  495 -10812 0
 10808 -10809  10810  495  10813 0

c  1-1 --> 0
c    (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0 ∧ -p_495) -> (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧ -b^{9, 56}_0)
c  in CNF:
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_2
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_1
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_0
c  in DIMACS:
 10808  10809 -10810  495 -10811 0
 10808  10809 -10810  495 -10812 0
 10808  10809 -10810  495 -10813 0

c  0-1 --> -1
c    (-b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧ -p_495) -> ( b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0)
c  in CNF:
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨  b^{9, 56}_2
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_1
c     b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨  b^{9, 56}_0
c  in DIMACS:
 10808  10809  10810  495  10811 0
 10808  10809  10810  495 -10812 0
 10808  10809  10810  495  10813 0

c  -1-1 --> -2
c    ( b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧  b^{9, 55}_0 ∧ -p_495) -> ( b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0)
c  in CNF:
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨  b^{9, 56}_2
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨  b^{9, 56}_1
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨  p_495 ∨ -b^{9, 56}_0
c  in DIMACS:
-10808  10809 -10810  495  10811 0
-10808  10809 -10810  495  10812 0
-10808  10809 -10810  495 -10813 0

c  -2-1 --> break 
c    ( b^{9, 55}_2 ∧  b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨  b^{9, 55}_0 ∨  p_495 ∨ break
c  in DIMACS:
-10808 -10809  10810  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 55}_2 ∧ -b^{9, 55}_1 ∧ -b^{9, 55}_0 ∧ true) 
c  in CNF:
c    -b^{9, 55}_2 ∨  b^{9, 55}_1 ∨  b^{9, 55}_0 ∨ false 
c  in DIMACS:
-10808  10809  10810  0

c  3 does not represent an automaton state.
c    -(-b^{9, 55}_2 ∧  b^{9, 55}_1 ∧  b^{9, 55}_0 ∧ true) 
c  in CNF:
c     b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ false 
c  in DIMACS:
 10808 -10809 -10810  0
c  -3 does not represent an automaton state.
c    -( b^{9, 55}_2 ∧  b^{9, 55}_1 ∧  b^{9, 55}_0 ∧ true) 
c  in CNF:
c    -b^{9, 55}_2 ∨ -b^{9, 55}_1 ∨ -b^{9, 55}_0 ∨ false 
c  in DIMACS:
-10808 -10809 -10810  0

c i = 56
c  -2+1 --> -1
c    ( b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧  p_504) -> ( b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0)
c  in CNF:
c    -b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨  b^{9, 57}_2
c    -b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_1
c    -b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨  b^{9, 57}_0
c  in DIMACS:
-10811 -10812  10813 -504  10814 0
-10811 -10812  10813 -504 -10815 0
-10811 -10812  10813 -504  10816 0

c  -1+1 --> 0
c    ( b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0 ∧  p_504) -> (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧ -b^{9, 57}_0)
c  in CNF:
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_2
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_1
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_0
c  in DIMACS:
-10811  10812 -10813 -504 -10814 0
-10811  10812 -10813 -504 -10815 0
-10811  10812 -10813 -504 -10816 0

c  0+1 --> 1
c    (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧  p_504) -> (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0)
c  in CNF:
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_2
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_1
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨  b^{9, 57}_0
c  in DIMACS:
 10811  10812  10813 -504 -10814 0
 10811  10812  10813 -504 -10815 0
 10811  10812  10813 -504  10816 0

c  1+1 --> 2
c    (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0 ∧  p_504) -> (-b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0)
c  in CNF:
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_2
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨  b^{9, 57}_1
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ -p_504 ∨ -b^{9, 57}_0
c  in DIMACS:
 10811  10812 -10813 -504 -10814 0
 10811  10812 -10813 -504  10815 0
 10811  10812 -10813 -504 -10816 0

c  2+1 --> break 
c    (-b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧  p_504) -> break
c  in CNF:
c     b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 10811 -10812  10813 -504 1162 0


c  2-1 --> 1
c    (-b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧ -p_504) -> (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0)
c  in CNF:
c     b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_2
c     b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_1
c     b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨  b^{9, 57}_0
c  in DIMACS:
 10811 -10812  10813  504 -10814 0
 10811 -10812  10813  504 -10815 0
 10811 -10812  10813  504  10816 0

c  1-1 --> 0
c    (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0 ∧ -p_504) -> (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧ -b^{9, 57}_0)
c  in CNF:
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_2
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_1
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_0
c  in DIMACS:
 10811  10812 -10813  504 -10814 0
 10811  10812 -10813  504 -10815 0
 10811  10812 -10813  504 -10816 0

c  0-1 --> -1
c    (-b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧ -p_504) -> ( b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0)
c  in CNF:
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨  b^{9, 57}_2
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_1
c     b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨  b^{9, 57}_0
c  in DIMACS:
 10811  10812  10813  504  10814 0
 10811  10812  10813  504 -10815 0
 10811  10812  10813  504  10816 0

c  -1-1 --> -2
c    ( b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧  b^{9, 56}_0 ∧ -p_504) -> ( b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0)
c  in CNF:
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨  b^{9, 57}_2
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨  b^{9, 57}_1
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨  p_504 ∨ -b^{9, 57}_0
c  in DIMACS:
-10811  10812 -10813  504  10814 0
-10811  10812 -10813  504  10815 0
-10811  10812 -10813  504 -10816 0

c  -2-1 --> break 
c    ( b^{9, 56}_2 ∧  b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨  b^{9, 56}_0 ∨  p_504 ∨ break
c  in DIMACS:
-10811 -10812  10813  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 56}_2 ∧ -b^{9, 56}_1 ∧ -b^{9, 56}_0 ∧ true) 
c  in CNF:
c    -b^{9, 56}_2 ∨  b^{9, 56}_1 ∨  b^{9, 56}_0 ∨ false 
c  in DIMACS:
-10811  10812  10813  0

c  3 does not represent an automaton state.
c    -(-b^{9, 56}_2 ∧  b^{9, 56}_1 ∧  b^{9, 56}_0 ∧ true) 
c  in CNF:
c     b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ false 
c  in DIMACS:
 10811 -10812 -10813  0
c  -3 does not represent an automaton state.
c    -( b^{9, 56}_2 ∧  b^{9, 56}_1 ∧  b^{9, 56}_0 ∧ true) 
c  in CNF:
c    -b^{9, 56}_2 ∨ -b^{9, 56}_1 ∨ -b^{9, 56}_0 ∨ false 
c  in DIMACS:
-10811 -10812 -10813  0

c i = 57
c  -2+1 --> -1
c    ( b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧  p_513) -> ( b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0)
c  in CNF:
c    -b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨  b^{9, 58}_2
c    -b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_1
c    -b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨  b^{9, 58}_0
c  in DIMACS:
-10814 -10815  10816 -513  10817 0
-10814 -10815  10816 -513 -10818 0
-10814 -10815  10816 -513  10819 0

c  -1+1 --> 0
c    ( b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0 ∧  p_513) -> (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧ -b^{9, 58}_0)
c  in CNF:
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_2
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_1
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_0
c  in DIMACS:
-10814  10815 -10816 -513 -10817 0
-10814  10815 -10816 -513 -10818 0
-10814  10815 -10816 -513 -10819 0

c  0+1 --> 1
c    (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧  p_513) -> (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0)
c  in CNF:
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_2
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_1
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨  b^{9, 58}_0
c  in DIMACS:
 10814  10815  10816 -513 -10817 0
 10814  10815  10816 -513 -10818 0
 10814  10815  10816 -513  10819 0

c  1+1 --> 2
c    (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0 ∧  p_513) -> (-b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0)
c  in CNF:
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_2
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨  b^{9, 58}_1
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ -p_513 ∨ -b^{9, 58}_0
c  in DIMACS:
 10814  10815 -10816 -513 -10817 0
 10814  10815 -10816 -513  10818 0
 10814  10815 -10816 -513 -10819 0

c  2+1 --> break 
c    (-b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧  p_513) -> break
c  in CNF:
c     b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 10814 -10815  10816 -513 1162 0


c  2-1 --> 1
c    (-b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧ -p_513) -> (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0)
c  in CNF:
c     b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_2
c     b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_1
c     b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨  b^{9, 58}_0
c  in DIMACS:
 10814 -10815  10816  513 -10817 0
 10814 -10815  10816  513 -10818 0
 10814 -10815  10816  513  10819 0

c  1-1 --> 0
c    (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0 ∧ -p_513) -> (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧ -b^{9, 58}_0)
c  in CNF:
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_2
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_1
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_0
c  in DIMACS:
 10814  10815 -10816  513 -10817 0
 10814  10815 -10816  513 -10818 0
 10814  10815 -10816  513 -10819 0

c  0-1 --> -1
c    (-b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧ -p_513) -> ( b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0)
c  in CNF:
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨  b^{9, 58}_2
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_1
c     b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨  b^{9, 58}_0
c  in DIMACS:
 10814  10815  10816  513  10817 0
 10814  10815  10816  513 -10818 0
 10814  10815  10816  513  10819 0

c  -1-1 --> -2
c    ( b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧  b^{9, 57}_0 ∧ -p_513) -> ( b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0)
c  in CNF:
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨  b^{9, 58}_2
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨  b^{9, 58}_1
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨  p_513 ∨ -b^{9, 58}_0
c  in DIMACS:
-10814  10815 -10816  513  10817 0
-10814  10815 -10816  513  10818 0
-10814  10815 -10816  513 -10819 0

c  -2-1 --> break 
c    ( b^{9, 57}_2 ∧  b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨  b^{9, 57}_0 ∨  p_513 ∨ break
c  in DIMACS:
-10814 -10815  10816  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 57}_2 ∧ -b^{9, 57}_1 ∧ -b^{9, 57}_0 ∧ true) 
c  in CNF:
c    -b^{9, 57}_2 ∨  b^{9, 57}_1 ∨  b^{9, 57}_0 ∨ false 
c  in DIMACS:
-10814  10815  10816  0

c  3 does not represent an automaton state.
c    -(-b^{9, 57}_2 ∧  b^{9, 57}_1 ∧  b^{9, 57}_0 ∧ true) 
c  in CNF:
c     b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ false 
c  in DIMACS:
 10814 -10815 -10816  0
c  -3 does not represent an automaton state.
c    -( b^{9, 57}_2 ∧  b^{9, 57}_1 ∧  b^{9, 57}_0 ∧ true) 
c  in CNF:
c    -b^{9, 57}_2 ∨ -b^{9, 57}_1 ∨ -b^{9, 57}_0 ∨ false 
c  in DIMACS:
-10814 -10815 -10816  0

c i = 58
c  -2+1 --> -1
c    ( b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧  p_522) -> ( b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0)
c  in CNF:
c    -b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨  b^{9, 59}_2
c    -b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_1
c    -b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨  b^{9, 59}_0
c  in DIMACS:
-10817 -10818  10819 -522  10820 0
-10817 -10818  10819 -522 -10821 0
-10817 -10818  10819 -522  10822 0

c  -1+1 --> 0
c    ( b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0 ∧  p_522) -> (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧ -b^{9, 59}_0)
c  in CNF:
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_2
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_1
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_0
c  in DIMACS:
-10817  10818 -10819 -522 -10820 0
-10817  10818 -10819 -522 -10821 0
-10817  10818 -10819 -522 -10822 0

c  0+1 --> 1
c    (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧  p_522) -> (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0)
c  in CNF:
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_2
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_1
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨  b^{9, 59}_0
c  in DIMACS:
 10817  10818  10819 -522 -10820 0
 10817  10818  10819 -522 -10821 0
 10817  10818  10819 -522  10822 0

c  1+1 --> 2
c    (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0 ∧  p_522) -> (-b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0)
c  in CNF:
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_2
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨  b^{9, 59}_1
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ -p_522 ∨ -b^{9, 59}_0
c  in DIMACS:
 10817  10818 -10819 -522 -10820 0
 10817  10818 -10819 -522  10821 0
 10817  10818 -10819 -522 -10822 0

c  2+1 --> break 
c    (-b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧  p_522) -> break
c  in CNF:
c     b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 10817 -10818  10819 -522 1162 0


c  2-1 --> 1
c    (-b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧ -p_522) -> (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0)
c  in CNF:
c     b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_2
c     b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_1
c     b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨  b^{9, 59}_0
c  in DIMACS:
 10817 -10818  10819  522 -10820 0
 10817 -10818  10819  522 -10821 0
 10817 -10818  10819  522  10822 0

c  1-1 --> 0
c    (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0 ∧ -p_522) -> (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧ -b^{9, 59}_0)
c  in CNF:
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_2
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_1
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_0
c  in DIMACS:
 10817  10818 -10819  522 -10820 0
 10817  10818 -10819  522 -10821 0
 10817  10818 -10819  522 -10822 0

c  0-1 --> -1
c    (-b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧ -p_522) -> ( b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0)
c  in CNF:
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨  b^{9, 59}_2
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_1
c     b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨  b^{9, 59}_0
c  in DIMACS:
 10817  10818  10819  522  10820 0
 10817  10818  10819  522 -10821 0
 10817  10818  10819  522  10822 0

c  -1-1 --> -2
c    ( b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧  b^{9, 58}_0 ∧ -p_522) -> ( b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0)
c  in CNF:
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨  b^{9, 59}_2
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨  b^{9, 59}_1
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨  p_522 ∨ -b^{9, 59}_0
c  in DIMACS:
-10817  10818 -10819  522  10820 0
-10817  10818 -10819  522  10821 0
-10817  10818 -10819  522 -10822 0

c  -2-1 --> break 
c    ( b^{9, 58}_2 ∧  b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨  b^{9, 58}_0 ∨  p_522 ∨ break
c  in DIMACS:
-10817 -10818  10819  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 58}_2 ∧ -b^{9, 58}_1 ∧ -b^{9, 58}_0 ∧ true) 
c  in CNF:
c    -b^{9, 58}_2 ∨  b^{9, 58}_1 ∨  b^{9, 58}_0 ∨ false 
c  in DIMACS:
-10817  10818  10819  0

c  3 does not represent an automaton state.
c    -(-b^{9, 58}_2 ∧  b^{9, 58}_1 ∧  b^{9, 58}_0 ∧ true) 
c  in CNF:
c     b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ false 
c  in DIMACS:
 10817 -10818 -10819  0
c  -3 does not represent an automaton state.
c    -( b^{9, 58}_2 ∧  b^{9, 58}_1 ∧  b^{9, 58}_0 ∧ true) 
c  in CNF:
c    -b^{9, 58}_2 ∨ -b^{9, 58}_1 ∨ -b^{9, 58}_0 ∨ false 
c  in DIMACS:
-10817 -10818 -10819  0

c i = 59
c  -2+1 --> -1
c    ( b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧  p_531) -> ( b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0)
c  in CNF:
c    -b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨  b^{9, 60}_2
c    -b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_1
c    -b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨  b^{9, 60}_0
c  in DIMACS:
-10820 -10821  10822 -531  10823 0
-10820 -10821  10822 -531 -10824 0
-10820 -10821  10822 -531  10825 0

c  -1+1 --> 0
c    ( b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0 ∧  p_531) -> (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧ -b^{9, 60}_0)
c  in CNF:
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_2
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_1
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_0
c  in DIMACS:
-10820  10821 -10822 -531 -10823 0
-10820  10821 -10822 -531 -10824 0
-10820  10821 -10822 -531 -10825 0

c  0+1 --> 1
c    (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧  p_531) -> (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0)
c  in CNF:
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_2
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_1
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨  b^{9, 60}_0
c  in DIMACS:
 10820  10821  10822 -531 -10823 0
 10820  10821  10822 -531 -10824 0
 10820  10821  10822 -531  10825 0

c  1+1 --> 2
c    (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0 ∧  p_531) -> (-b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0)
c  in CNF:
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_2
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨  b^{9, 60}_1
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ -p_531 ∨ -b^{9, 60}_0
c  in DIMACS:
 10820  10821 -10822 -531 -10823 0
 10820  10821 -10822 -531  10824 0
 10820  10821 -10822 -531 -10825 0

c  2+1 --> break 
c    (-b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧  p_531) -> break
c  in CNF:
c     b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ -p_531 ∨ break
c  in DIMACS:
 10820 -10821  10822 -531 1162 0


c  2-1 --> 1
c    (-b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧ -p_531) -> (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0)
c  in CNF:
c     b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_2
c     b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_1
c     b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨  b^{9, 60}_0
c  in DIMACS:
 10820 -10821  10822  531 -10823 0
 10820 -10821  10822  531 -10824 0
 10820 -10821  10822  531  10825 0

c  1-1 --> 0
c    (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0 ∧ -p_531) -> (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧ -b^{9, 60}_0)
c  in CNF:
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_2
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_1
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_0
c  in DIMACS:
 10820  10821 -10822  531 -10823 0
 10820  10821 -10822  531 -10824 0
 10820  10821 -10822  531 -10825 0

c  0-1 --> -1
c    (-b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧ -p_531) -> ( b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0)
c  in CNF:
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨  b^{9, 60}_2
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_1
c     b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨  b^{9, 60}_0
c  in DIMACS:
 10820  10821  10822  531  10823 0
 10820  10821  10822  531 -10824 0
 10820  10821  10822  531  10825 0

c  -1-1 --> -2
c    ( b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧  b^{9, 59}_0 ∧ -p_531) -> ( b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0)
c  in CNF:
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨  b^{9, 60}_2
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨  b^{9, 60}_1
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨  p_531 ∨ -b^{9, 60}_0
c  in DIMACS:
-10820  10821 -10822  531  10823 0
-10820  10821 -10822  531  10824 0
-10820  10821 -10822  531 -10825 0

c  -2-1 --> break 
c    ( b^{9, 59}_2 ∧  b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧ -p_531) -> break
c  in CNF:
c    -b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨  b^{9, 59}_0 ∨  p_531 ∨ break
c  in DIMACS:
-10820 -10821  10822  531 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 59}_2 ∧ -b^{9, 59}_1 ∧ -b^{9, 59}_0 ∧ true) 
c  in CNF:
c    -b^{9, 59}_2 ∨  b^{9, 59}_1 ∨  b^{9, 59}_0 ∨ false 
c  in DIMACS:
-10820  10821  10822  0

c  3 does not represent an automaton state.
c    -(-b^{9, 59}_2 ∧  b^{9, 59}_1 ∧  b^{9, 59}_0 ∧ true) 
c  in CNF:
c     b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ false 
c  in DIMACS:
 10820 -10821 -10822  0
c  -3 does not represent an automaton state.
c    -( b^{9, 59}_2 ∧  b^{9, 59}_1 ∧  b^{9, 59}_0 ∧ true) 
c  in CNF:
c    -b^{9, 59}_2 ∨ -b^{9, 59}_1 ∨ -b^{9, 59}_0 ∨ false 
c  in DIMACS:
-10820 -10821 -10822  0

c i = 60
c  -2+1 --> -1
c    ( b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧  p_540) -> ( b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0)
c  in CNF:
c    -b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨  b^{9, 61}_2
c    -b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_1
c    -b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨  b^{9, 61}_0
c  in DIMACS:
-10823 -10824  10825 -540  10826 0
-10823 -10824  10825 -540 -10827 0
-10823 -10824  10825 -540  10828 0

c  -1+1 --> 0
c    ( b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0 ∧  p_540) -> (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧ -b^{9, 61}_0)
c  in CNF:
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_2
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_1
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_0
c  in DIMACS:
-10823  10824 -10825 -540 -10826 0
-10823  10824 -10825 -540 -10827 0
-10823  10824 -10825 -540 -10828 0

c  0+1 --> 1
c    (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧  p_540) -> (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0)
c  in CNF:
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_2
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_1
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨  b^{9, 61}_0
c  in DIMACS:
 10823  10824  10825 -540 -10826 0
 10823  10824  10825 -540 -10827 0
 10823  10824  10825 -540  10828 0

c  1+1 --> 2
c    (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0 ∧  p_540) -> (-b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0)
c  in CNF:
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_2
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨  b^{9, 61}_1
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ -p_540 ∨ -b^{9, 61}_0
c  in DIMACS:
 10823  10824 -10825 -540 -10826 0
 10823  10824 -10825 -540  10827 0
 10823  10824 -10825 -540 -10828 0

c  2+1 --> break 
c    (-b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧  p_540) -> break
c  in CNF:
c     b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 10823 -10824  10825 -540 1162 0


c  2-1 --> 1
c    (-b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧ -p_540) -> (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0)
c  in CNF:
c     b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_2
c     b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_1
c     b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨  b^{9, 61}_0
c  in DIMACS:
 10823 -10824  10825  540 -10826 0
 10823 -10824  10825  540 -10827 0
 10823 -10824  10825  540  10828 0

c  1-1 --> 0
c    (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0 ∧ -p_540) -> (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧ -b^{9, 61}_0)
c  in CNF:
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_2
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_1
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_0
c  in DIMACS:
 10823  10824 -10825  540 -10826 0
 10823  10824 -10825  540 -10827 0
 10823  10824 -10825  540 -10828 0

c  0-1 --> -1
c    (-b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧ -p_540) -> ( b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0)
c  in CNF:
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨  b^{9, 61}_2
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_1
c     b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨  b^{9, 61}_0
c  in DIMACS:
 10823  10824  10825  540  10826 0
 10823  10824  10825  540 -10827 0
 10823  10824  10825  540  10828 0

c  -1-1 --> -2
c    ( b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧  b^{9, 60}_0 ∧ -p_540) -> ( b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0)
c  in CNF:
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨  b^{9, 61}_2
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨  b^{9, 61}_1
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨  p_540 ∨ -b^{9, 61}_0
c  in DIMACS:
-10823  10824 -10825  540  10826 0
-10823  10824 -10825  540  10827 0
-10823  10824 -10825  540 -10828 0

c  -2-1 --> break 
c    ( b^{9, 60}_2 ∧  b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨  b^{9, 60}_0 ∨  p_540 ∨ break
c  in DIMACS:
-10823 -10824  10825  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 60}_2 ∧ -b^{9, 60}_1 ∧ -b^{9, 60}_0 ∧ true) 
c  in CNF:
c    -b^{9, 60}_2 ∨  b^{9, 60}_1 ∨  b^{9, 60}_0 ∨ false 
c  in DIMACS:
-10823  10824  10825  0

c  3 does not represent an automaton state.
c    -(-b^{9, 60}_2 ∧  b^{9, 60}_1 ∧  b^{9, 60}_0 ∧ true) 
c  in CNF:
c     b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ false 
c  in DIMACS:
 10823 -10824 -10825  0
c  -3 does not represent an automaton state.
c    -( b^{9, 60}_2 ∧  b^{9, 60}_1 ∧  b^{9, 60}_0 ∧ true) 
c  in CNF:
c    -b^{9, 60}_2 ∨ -b^{9, 60}_1 ∨ -b^{9, 60}_0 ∨ false 
c  in DIMACS:
-10823 -10824 -10825  0

c i = 61
c  -2+1 --> -1
c    ( b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧  p_549) -> ( b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0)
c  in CNF:
c    -b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨  b^{9, 62}_2
c    -b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_1
c    -b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨  b^{9, 62}_0
c  in DIMACS:
-10826 -10827  10828 -549  10829 0
-10826 -10827  10828 -549 -10830 0
-10826 -10827  10828 -549  10831 0

c  -1+1 --> 0
c    ( b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0 ∧  p_549) -> (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧ -b^{9, 62}_0)
c  in CNF:
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_2
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_1
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_0
c  in DIMACS:
-10826  10827 -10828 -549 -10829 0
-10826  10827 -10828 -549 -10830 0
-10826  10827 -10828 -549 -10831 0

c  0+1 --> 1
c    (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧  p_549) -> (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0)
c  in CNF:
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_2
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_1
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨  b^{9, 62}_0
c  in DIMACS:
 10826  10827  10828 -549 -10829 0
 10826  10827  10828 -549 -10830 0
 10826  10827  10828 -549  10831 0

c  1+1 --> 2
c    (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0 ∧  p_549) -> (-b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0)
c  in CNF:
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_2
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨  b^{9, 62}_1
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ -p_549 ∨ -b^{9, 62}_0
c  in DIMACS:
 10826  10827 -10828 -549 -10829 0
 10826  10827 -10828 -549  10830 0
 10826  10827 -10828 -549 -10831 0

c  2+1 --> break 
c    (-b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧  p_549) -> break
c  in CNF:
c     b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ -p_549 ∨ break
c  in DIMACS:
 10826 -10827  10828 -549 1162 0


c  2-1 --> 1
c    (-b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧ -p_549) -> (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0)
c  in CNF:
c     b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_2
c     b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_1
c     b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨  b^{9, 62}_0
c  in DIMACS:
 10826 -10827  10828  549 -10829 0
 10826 -10827  10828  549 -10830 0
 10826 -10827  10828  549  10831 0

c  1-1 --> 0
c    (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0 ∧ -p_549) -> (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧ -b^{9, 62}_0)
c  in CNF:
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_2
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_1
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_0
c  in DIMACS:
 10826  10827 -10828  549 -10829 0
 10826  10827 -10828  549 -10830 0
 10826  10827 -10828  549 -10831 0

c  0-1 --> -1
c    (-b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧ -p_549) -> ( b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0)
c  in CNF:
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨  b^{9, 62}_2
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_1
c     b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨  b^{9, 62}_0
c  in DIMACS:
 10826  10827  10828  549  10829 0
 10826  10827  10828  549 -10830 0
 10826  10827  10828  549  10831 0

c  -1-1 --> -2
c    ( b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧  b^{9, 61}_0 ∧ -p_549) -> ( b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0)
c  in CNF:
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨  b^{9, 62}_2
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨  b^{9, 62}_1
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨  p_549 ∨ -b^{9, 62}_0
c  in DIMACS:
-10826  10827 -10828  549  10829 0
-10826  10827 -10828  549  10830 0
-10826  10827 -10828  549 -10831 0

c  -2-1 --> break 
c    ( b^{9, 61}_2 ∧  b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧ -p_549) -> break
c  in CNF:
c    -b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨  b^{9, 61}_0 ∨  p_549 ∨ break
c  in DIMACS:
-10826 -10827  10828  549 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 61}_2 ∧ -b^{9, 61}_1 ∧ -b^{9, 61}_0 ∧ true) 
c  in CNF:
c    -b^{9, 61}_2 ∨  b^{9, 61}_1 ∨  b^{9, 61}_0 ∨ false 
c  in DIMACS:
-10826  10827  10828  0

c  3 does not represent an automaton state.
c    -(-b^{9, 61}_2 ∧  b^{9, 61}_1 ∧  b^{9, 61}_0 ∧ true) 
c  in CNF:
c     b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ false 
c  in DIMACS:
 10826 -10827 -10828  0
c  -3 does not represent an automaton state.
c    -( b^{9, 61}_2 ∧  b^{9, 61}_1 ∧  b^{9, 61}_0 ∧ true) 
c  in CNF:
c    -b^{9, 61}_2 ∨ -b^{9, 61}_1 ∨ -b^{9, 61}_0 ∨ false 
c  in DIMACS:
-10826 -10827 -10828  0

c i = 62
c  -2+1 --> -1
c    ( b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧  p_558) -> ( b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0)
c  in CNF:
c    -b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨  b^{9, 63}_2
c    -b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_1
c    -b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨  b^{9, 63}_0
c  in DIMACS:
-10829 -10830  10831 -558  10832 0
-10829 -10830  10831 -558 -10833 0
-10829 -10830  10831 -558  10834 0

c  -1+1 --> 0
c    ( b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0 ∧  p_558) -> (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧ -b^{9, 63}_0)
c  in CNF:
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_2
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_1
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_0
c  in DIMACS:
-10829  10830 -10831 -558 -10832 0
-10829  10830 -10831 -558 -10833 0
-10829  10830 -10831 -558 -10834 0

c  0+1 --> 1
c    (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧  p_558) -> (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0)
c  in CNF:
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_2
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_1
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨  b^{9, 63}_0
c  in DIMACS:
 10829  10830  10831 -558 -10832 0
 10829  10830  10831 -558 -10833 0
 10829  10830  10831 -558  10834 0

c  1+1 --> 2
c    (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0 ∧  p_558) -> (-b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0)
c  in CNF:
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_2
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨  b^{9, 63}_1
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ -p_558 ∨ -b^{9, 63}_0
c  in DIMACS:
 10829  10830 -10831 -558 -10832 0
 10829  10830 -10831 -558  10833 0
 10829  10830 -10831 -558 -10834 0

c  2+1 --> break 
c    (-b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧  p_558) -> break
c  in CNF:
c     b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 10829 -10830  10831 -558 1162 0


c  2-1 --> 1
c    (-b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧ -p_558) -> (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0)
c  in CNF:
c     b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_2
c     b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_1
c     b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨  b^{9, 63}_0
c  in DIMACS:
 10829 -10830  10831  558 -10832 0
 10829 -10830  10831  558 -10833 0
 10829 -10830  10831  558  10834 0

c  1-1 --> 0
c    (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0 ∧ -p_558) -> (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧ -b^{9, 63}_0)
c  in CNF:
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_2
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_1
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_0
c  in DIMACS:
 10829  10830 -10831  558 -10832 0
 10829  10830 -10831  558 -10833 0
 10829  10830 -10831  558 -10834 0

c  0-1 --> -1
c    (-b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧ -p_558) -> ( b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0)
c  in CNF:
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨  b^{9, 63}_2
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_1
c     b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨  b^{9, 63}_0
c  in DIMACS:
 10829  10830  10831  558  10832 0
 10829  10830  10831  558 -10833 0
 10829  10830  10831  558  10834 0

c  -1-1 --> -2
c    ( b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧  b^{9, 62}_0 ∧ -p_558) -> ( b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0)
c  in CNF:
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨  b^{9, 63}_2
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨  b^{9, 63}_1
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨  p_558 ∨ -b^{9, 63}_0
c  in DIMACS:
-10829  10830 -10831  558  10832 0
-10829  10830 -10831  558  10833 0
-10829  10830 -10831  558 -10834 0

c  -2-1 --> break 
c    ( b^{9, 62}_2 ∧  b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨  b^{9, 62}_0 ∨  p_558 ∨ break
c  in DIMACS:
-10829 -10830  10831  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 62}_2 ∧ -b^{9, 62}_1 ∧ -b^{9, 62}_0 ∧ true) 
c  in CNF:
c    -b^{9, 62}_2 ∨  b^{9, 62}_1 ∨  b^{9, 62}_0 ∨ false 
c  in DIMACS:
-10829  10830  10831  0

c  3 does not represent an automaton state.
c    -(-b^{9, 62}_2 ∧  b^{9, 62}_1 ∧  b^{9, 62}_0 ∧ true) 
c  in CNF:
c     b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ false 
c  in DIMACS:
 10829 -10830 -10831  0
c  -3 does not represent an automaton state.
c    -( b^{9, 62}_2 ∧  b^{9, 62}_1 ∧  b^{9, 62}_0 ∧ true) 
c  in CNF:
c    -b^{9, 62}_2 ∨ -b^{9, 62}_1 ∨ -b^{9, 62}_0 ∨ false 
c  in DIMACS:
-10829 -10830 -10831  0

c i = 63
c  -2+1 --> -1
c    ( b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧  p_567) -> ( b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0)
c  in CNF:
c    -b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨  b^{9, 64}_2
c    -b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_1
c    -b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨  b^{9, 64}_0
c  in DIMACS:
-10832 -10833  10834 -567  10835 0
-10832 -10833  10834 -567 -10836 0
-10832 -10833  10834 -567  10837 0

c  -1+1 --> 0
c    ( b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0 ∧  p_567) -> (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧ -b^{9, 64}_0)
c  in CNF:
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_2
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_1
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_0
c  in DIMACS:
-10832  10833 -10834 -567 -10835 0
-10832  10833 -10834 -567 -10836 0
-10832  10833 -10834 -567 -10837 0

c  0+1 --> 1
c    (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧  p_567) -> (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0)
c  in CNF:
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_2
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_1
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨  b^{9, 64}_0
c  in DIMACS:
 10832  10833  10834 -567 -10835 0
 10832  10833  10834 -567 -10836 0
 10832  10833  10834 -567  10837 0

c  1+1 --> 2
c    (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0 ∧  p_567) -> (-b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0)
c  in CNF:
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_2
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨  b^{9, 64}_1
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ -p_567 ∨ -b^{9, 64}_0
c  in DIMACS:
 10832  10833 -10834 -567 -10835 0
 10832  10833 -10834 -567  10836 0
 10832  10833 -10834 -567 -10837 0

c  2+1 --> break 
c    (-b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧  p_567) -> break
c  in CNF:
c     b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 10832 -10833  10834 -567 1162 0


c  2-1 --> 1
c    (-b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧ -p_567) -> (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0)
c  in CNF:
c     b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_2
c     b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_1
c     b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨  b^{9, 64}_0
c  in DIMACS:
 10832 -10833  10834  567 -10835 0
 10832 -10833  10834  567 -10836 0
 10832 -10833  10834  567  10837 0

c  1-1 --> 0
c    (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0 ∧ -p_567) -> (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧ -b^{9, 64}_0)
c  in CNF:
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_2
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_1
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_0
c  in DIMACS:
 10832  10833 -10834  567 -10835 0
 10832  10833 -10834  567 -10836 0
 10832  10833 -10834  567 -10837 0

c  0-1 --> -1
c    (-b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧ -p_567) -> ( b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0)
c  in CNF:
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨  b^{9, 64}_2
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_1
c     b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨  b^{9, 64}_0
c  in DIMACS:
 10832  10833  10834  567  10835 0
 10832  10833  10834  567 -10836 0
 10832  10833  10834  567  10837 0

c  -1-1 --> -2
c    ( b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧  b^{9, 63}_0 ∧ -p_567) -> ( b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0)
c  in CNF:
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨  b^{9, 64}_2
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨  b^{9, 64}_1
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨  p_567 ∨ -b^{9, 64}_0
c  in DIMACS:
-10832  10833 -10834  567  10835 0
-10832  10833 -10834  567  10836 0
-10832  10833 -10834  567 -10837 0

c  -2-1 --> break 
c    ( b^{9, 63}_2 ∧  b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨  b^{9, 63}_0 ∨  p_567 ∨ break
c  in DIMACS:
-10832 -10833  10834  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 63}_2 ∧ -b^{9, 63}_1 ∧ -b^{9, 63}_0 ∧ true) 
c  in CNF:
c    -b^{9, 63}_2 ∨  b^{9, 63}_1 ∨  b^{9, 63}_0 ∨ false 
c  in DIMACS:
-10832  10833  10834  0

c  3 does not represent an automaton state.
c    -(-b^{9, 63}_2 ∧  b^{9, 63}_1 ∧  b^{9, 63}_0 ∧ true) 
c  in CNF:
c     b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ false 
c  in DIMACS:
 10832 -10833 -10834  0
c  -3 does not represent an automaton state.
c    -( b^{9, 63}_2 ∧  b^{9, 63}_1 ∧  b^{9, 63}_0 ∧ true) 
c  in CNF:
c    -b^{9, 63}_2 ∨ -b^{9, 63}_1 ∨ -b^{9, 63}_0 ∨ false 
c  in DIMACS:
-10832 -10833 -10834  0

c i = 64
c  -2+1 --> -1
c    ( b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧  p_576) -> ( b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0)
c  in CNF:
c    -b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨  b^{9, 65}_2
c    -b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_1
c    -b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨  b^{9, 65}_0
c  in DIMACS:
-10835 -10836  10837 -576  10838 0
-10835 -10836  10837 -576 -10839 0
-10835 -10836  10837 -576  10840 0

c  -1+1 --> 0
c    ( b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0 ∧  p_576) -> (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧ -b^{9, 65}_0)
c  in CNF:
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_2
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_1
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_0
c  in DIMACS:
-10835  10836 -10837 -576 -10838 0
-10835  10836 -10837 -576 -10839 0
-10835  10836 -10837 -576 -10840 0

c  0+1 --> 1
c    (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧  p_576) -> (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0)
c  in CNF:
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_2
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_1
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨  b^{9, 65}_0
c  in DIMACS:
 10835  10836  10837 -576 -10838 0
 10835  10836  10837 -576 -10839 0
 10835  10836  10837 -576  10840 0

c  1+1 --> 2
c    (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0 ∧  p_576) -> (-b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0)
c  in CNF:
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_2
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨  b^{9, 65}_1
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ -p_576 ∨ -b^{9, 65}_0
c  in DIMACS:
 10835  10836 -10837 -576 -10838 0
 10835  10836 -10837 -576  10839 0
 10835  10836 -10837 -576 -10840 0

c  2+1 --> break 
c    (-b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧  p_576) -> break
c  in CNF:
c     b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 10835 -10836  10837 -576 1162 0


c  2-1 --> 1
c    (-b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧ -p_576) -> (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0)
c  in CNF:
c     b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_2
c     b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_1
c     b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨  b^{9, 65}_0
c  in DIMACS:
 10835 -10836  10837  576 -10838 0
 10835 -10836  10837  576 -10839 0
 10835 -10836  10837  576  10840 0

c  1-1 --> 0
c    (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0 ∧ -p_576) -> (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧ -b^{9, 65}_0)
c  in CNF:
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_2
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_1
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_0
c  in DIMACS:
 10835  10836 -10837  576 -10838 0
 10835  10836 -10837  576 -10839 0
 10835  10836 -10837  576 -10840 0

c  0-1 --> -1
c    (-b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧ -p_576) -> ( b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0)
c  in CNF:
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨  b^{9, 65}_2
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_1
c     b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨  b^{9, 65}_0
c  in DIMACS:
 10835  10836  10837  576  10838 0
 10835  10836  10837  576 -10839 0
 10835  10836  10837  576  10840 0

c  -1-1 --> -2
c    ( b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧  b^{9, 64}_0 ∧ -p_576) -> ( b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0)
c  in CNF:
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨  b^{9, 65}_2
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨  b^{9, 65}_1
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨  p_576 ∨ -b^{9, 65}_0
c  in DIMACS:
-10835  10836 -10837  576  10838 0
-10835  10836 -10837  576  10839 0
-10835  10836 -10837  576 -10840 0

c  -2-1 --> break 
c    ( b^{9, 64}_2 ∧  b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨  b^{9, 64}_0 ∨  p_576 ∨ break
c  in DIMACS:
-10835 -10836  10837  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 64}_2 ∧ -b^{9, 64}_1 ∧ -b^{9, 64}_0 ∧ true) 
c  in CNF:
c    -b^{9, 64}_2 ∨  b^{9, 64}_1 ∨  b^{9, 64}_0 ∨ false 
c  in DIMACS:
-10835  10836  10837  0

c  3 does not represent an automaton state.
c    -(-b^{9, 64}_2 ∧  b^{9, 64}_1 ∧  b^{9, 64}_0 ∧ true) 
c  in CNF:
c     b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ false 
c  in DIMACS:
 10835 -10836 -10837  0
c  -3 does not represent an automaton state.
c    -( b^{9, 64}_2 ∧  b^{9, 64}_1 ∧  b^{9, 64}_0 ∧ true) 
c  in CNF:
c    -b^{9, 64}_2 ∨ -b^{9, 64}_1 ∨ -b^{9, 64}_0 ∨ false 
c  in DIMACS:
-10835 -10836 -10837  0

c i = 65
c  -2+1 --> -1
c    ( b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧  p_585) -> ( b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0)
c  in CNF:
c    -b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨  b^{9, 66}_2
c    -b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_1
c    -b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨  b^{9, 66}_0
c  in DIMACS:
-10838 -10839  10840 -585  10841 0
-10838 -10839  10840 -585 -10842 0
-10838 -10839  10840 -585  10843 0

c  -1+1 --> 0
c    ( b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0 ∧  p_585) -> (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧ -b^{9, 66}_0)
c  in CNF:
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_2
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_1
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_0
c  in DIMACS:
-10838  10839 -10840 -585 -10841 0
-10838  10839 -10840 -585 -10842 0
-10838  10839 -10840 -585 -10843 0

c  0+1 --> 1
c    (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧  p_585) -> (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0)
c  in CNF:
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_2
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_1
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨  b^{9, 66}_0
c  in DIMACS:
 10838  10839  10840 -585 -10841 0
 10838  10839  10840 -585 -10842 0
 10838  10839  10840 -585  10843 0

c  1+1 --> 2
c    (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0 ∧  p_585) -> (-b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0)
c  in CNF:
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_2
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨  b^{9, 66}_1
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ -p_585 ∨ -b^{9, 66}_0
c  in DIMACS:
 10838  10839 -10840 -585 -10841 0
 10838  10839 -10840 -585  10842 0
 10838  10839 -10840 -585 -10843 0

c  2+1 --> break 
c    (-b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧  p_585) -> break
c  in CNF:
c     b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 10838 -10839  10840 -585 1162 0


c  2-1 --> 1
c    (-b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧ -p_585) -> (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0)
c  in CNF:
c     b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_2
c     b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_1
c     b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨  b^{9, 66}_0
c  in DIMACS:
 10838 -10839  10840  585 -10841 0
 10838 -10839  10840  585 -10842 0
 10838 -10839  10840  585  10843 0

c  1-1 --> 0
c    (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0 ∧ -p_585) -> (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧ -b^{9, 66}_0)
c  in CNF:
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_2
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_1
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_0
c  in DIMACS:
 10838  10839 -10840  585 -10841 0
 10838  10839 -10840  585 -10842 0
 10838  10839 -10840  585 -10843 0

c  0-1 --> -1
c    (-b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧ -p_585) -> ( b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0)
c  in CNF:
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨  b^{9, 66}_2
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_1
c     b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨  b^{9, 66}_0
c  in DIMACS:
 10838  10839  10840  585  10841 0
 10838  10839  10840  585 -10842 0
 10838  10839  10840  585  10843 0

c  -1-1 --> -2
c    ( b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧  b^{9, 65}_0 ∧ -p_585) -> ( b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0)
c  in CNF:
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨  b^{9, 66}_2
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨  b^{9, 66}_1
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨  p_585 ∨ -b^{9, 66}_0
c  in DIMACS:
-10838  10839 -10840  585  10841 0
-10838  10839 -10840  585  10842 0
-10838  10839 -10840  585 -10843 0

c  -2-1 --> break 
c    ( b^{9, 65}_2 ∧  b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨  b^{9, 65}_0 ∨  p_585 ∨ break
c  in DIMACS:
-10838 -10839  10840  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 65}_2 ∧ -b^{9, 65}_1 ∧ -b^{9, 65}_0 ∧ true) 
c  in CNF:
c    -b^{9, 65}_2 ∨  b^{9, 65}_1 ∨  b^{9, 65}_0 ∨ false 
c  in DIMACS:
-10838  10839  10840  0

c  3 does not represent an automaton state.
c    -(-b^{9, 65}_2 ∧  b^{9, 65}_1 ∧  b^{9, 65}_0 ∧ true) 
c  in CNF:
c     b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ false 
c  in DIMACS:
 10838 -10839 -10840  0
c  -3 does not represent an automaton state.
c    -( b^{9, 65}_2 ∧  b^{9, 65}_1 ∧  b^{9, 65}_0 ∧ true) 
c  in CNF:
c    -b^{9, 65}_2 ∨ -b^{9, 65}_1 ∨ -b^{9, 65}_0 ∨ false 
c  in DIMACS:
-10838 -10839 -10840  0

c i = 66
c  -2+1 --> -1
c    ( b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧  p_594) -> ( b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0)
c  in CNF:
c    -b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨  b^{9, 67}_2
c    -b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_1
c    -b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨  b^{9, 67}_0
c  in DIMACS:
-10841 -10842  10843 -594  10844 0
-10841 -10842  10843 -594 -10845 0
-10841 -10842  10843 -594  10846 0

c  -1+1 --> 0
c    ( b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0 ∧  p_594) -> (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧ -b^{9, 67}_0)
c  in CNF:
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_2
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_1
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_0
c  in DIMACS:
-10841  10842 -10843 -594 -10844 0
-10841  10842 -10843 -594 -10845 0
-10841  10842 -10843 -594 -10846 0

c  0+1 --> 1
c    (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧  p_594) -> (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0)
c  in CNF:
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_2
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_1
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨  b^{9, 67}_0
c  in DIMACS:
 10841  10842  10843 -594 -10844 0
 10841  10842  10843 -594 -10845 0
 10841  10842  10843 -594  10846 0

c  1+1 --> 2
c    (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0 ∧  p_594) -> (-b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0)
c  in CNF:
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_2
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨  b^{9, 67}_1
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ -p_594 ∨ -b^{9, 67}_0
c  in DIMACS:
 10841  10842 -10843 -594 -10844 0
 10841  10842 -10843 -594  10845 0
 10841  10842 -10843 -594 -10846 0

c  2+1 --> break 
c    (-b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧  p_594) -> break
c  in CNF:
c     b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 10841 -10842  10843 -594 1162 0


c  2-1 --> 1
c    (-b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧ -p_594) -> (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0)
c  in CNF:
c     b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_2
c     b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_1
c     b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨  b^{9, 67}_0
c  in DIMACS:
 10841 -10842  10843  594 -10844 0
 10841 -10842  10843  594 -10845 0
 10841 -10842  10843  594  10846 0

c  1-1 --> 0
c    (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0 ∧ -p_594) -> (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧ -b^{9, 67}_0)
c  in CNF:
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_2
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_1
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_0
c  in DIMACS:
 10841  10842 -10843  594 -10844 0
 10841  10842 -10843  594 -10845 0
 10841  10842 -10843  594 -10846 0

c  0-1 --> -1
c    (-b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧ -p_594) -> ( b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0)
c  in CNF:
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨  b^{9, 67}_2
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_1
c     b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨  b^{9, 67}_0
c  in DIMACS:
 10841  10842  10843  594  10844 0
 10841  10842  10843  594 -10845 0
 10841  10842  10843  594  10846 0

c  -1-1 --> -2
c    ( b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧  b^{9, 66}_0 ∧ -p_594) -> ( b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0)
c  in CNF:
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨  b^{9, 67}_2
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨  b^{9, 67}_1
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨  p_594 ∨ -b^{9, 67}_0
c  in DIMACS:
-10841  10842 -10843  594  10844 0
-10841  10842 -10843  594  10845 0
-10841  10842 -10843  594 -10846 0

c  -2-1 --> break 
c    ( b^{9, 66}_2 ∧  b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨  b^{9, 66}_0 ∨  p_594 ∨ break
c  in DIMACS:
-10841 -10842  10843  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 66}_2 ∧ -b^{9, 66}_1 ∧ -b^{9, 66}_0 ∧ true) 
c  in CNF:
c    -b^{9, 66}_2 ∨  b^{9, 66}_1 ∨  b^{9, 66}_0 ∨ false 
c  in DIMACS:
-10841  10842  10843  0

c  3 does not represent an automaton state.
c    -(-b^{9, 66}_2 ∧  b^{9, 66}_1 ∧  b^{9, 66}_0 ∧ true) 
c  in CNF:
c     b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ false 
c  in DIMACS:
 10841 -10842 -10843  0
c  -3 does not represent an automaton state.
c    -( b^{9, 66}_2 ∧  b^{9, 66}_1 ∧  b^{9, 66}_0 ∧ true) 
c  in CNF:
c    -b^{9, 66}_2 ∨ -b^{9, 66}_1 ∨ -b^{9, 66}_0 ∨ false 
c  in DIMACS:
-10841 -10842 -10843  0

c i = 67
c  -2+1 --> -1
c    ( b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧  p_603) -> ( b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0)
c  in CNF:
c    -b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨  b^{9, 68}_2
c    -b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_1
c    -b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨  b^{9, 68}_0
c  in DIMACS:
-10844 -10845  10846 -603  10847 0
-10844 -10845  10846 -603 -10848 0
-10844 -10845  10846 -603  10849 0

c  -1+1 --> 0
c    ( b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0 ∧  p_603) -> (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧ -b^{9, 68}_0)
c  in CNF:
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_2
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_1
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_0
c  in DIMACS:
-10844  10845 -10846 -603 -10847 0
-10844  10845 -10846 -603 -10848 0
-10844  10845 -10846 -603 -10849 0

c  0+1 --> 1
c    (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧  p_603) -> (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0)
c  in CNF:
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_2
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_1
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨  b^{9, 68}_0
c  in DIMACS:
 10844  10845  10846 -603 -10847 0
 10844  10845  10846 -603 -10848 0
 10844  10845  10846 -603  10849 0

c  1+1 --> 2
c    (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0 ∧  p_603) -> (-b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0)
c  in CNF:
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_2
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨  b^{9, 68}_1
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ -p_603 ∨ -b^{9, 68}_0
c  in DIMACS:
 10844  10845 -10846 -603 -10847 0
 10844  10845 -10846 -603  10848 0
 10844  10845 -10846 -603 -10849 0

c  2+1 --> break 
c    (-b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧  p_603) -> break
c  in CNF:
c     b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ -p_603 ∨ break
c  in DIMACS:
 10844 -10845  10846 -603 1162 0


c  2-1 --> 1
c    (-b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧ -p_603) -> (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0)
c  in CNF:
c     b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_2
c     b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_1
c     b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨  b^{9, 68}_0
c  in DIMACS:
 10844 -10845  10846  603 -10847 0
 10844 -10845  10846  603 -10848 0
 10844 -10845  10846  603  10849 0

c  1-1 --> 0
c    (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0 ∧ -p_603) -> (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧ -b^{9, 68}_0)
c  in CNF:
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_2
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_1
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_0
c  in DIMACS:
 10844  10845 -10846  603 -10847 0
 10844  10845 -10846  603 -10848 0
 10844  10845 -10846  603 -10849 0

c  0-1 --> -1
c    (-b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧ -p_603) -> ( b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0)
c  in CNF:
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨  b^{9, 68}_2
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_1
c     b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨  b^{9, 68}_0
c  in DIMACS:
 10844  10845  10846  603  10847 0
 10844  10845  10846  603 -10848 0
 10844  10845  10846  603  10849 0

c  -1-1 --> -2
c    ( b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧  b^{9, 67}_0 ∧ -p_603) -> ( b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0)
c  in CNF:
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨  b^{9, 68}_2
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨  b^{9, 68}_1
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨  p_603 ∨ -b^{9, 68}_0
c  in DIMACS:
-10844  10845 -10846  603  10847 0
-10844  10845 -10846  603  10848 0
-10844  10845 -10846  603 -10849 0

c  -2-1 --> break 
c    ( b^{9, 67}_2 ∧  b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧ -p_603) -> break
c  in CNF:
c    -b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨  b^{9, 67}_0 ∨  p_603 ∨ break
c  in DIMACS:
-10844 -10845  10846  603 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 67}_2 ∧ -b^{9, 67}_1 ∧ -b^{9, 67}_0 ∧ true) 
c  in CNF:
c    -b^{9, 67}_2 ∨  b^{9, 67}_1 ∨  b^{9, 67}_0 ∨ false 
c  in DIMACS:
-10844  10845  10846  0

c  3 does not represent an automaton state.
c    -(-b^{9, 67}_2 ∧  b^{9, 67}_1 ∧  b^{9, 67}_0 ∧ true) 
c  in CNF:
c     b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ false 
c  in DIMACS:
 10844 -10845 -10846  0
c  -3 does not represent an automaton state.
c    -( b^{9, 67}_2 ∧  b^{9, 67}_1 ∧  b^{9, 67}_0 ∧ true) 
c  in CNF:
c    -b^{9, 67}_2 ∨ -b^{9, 67}_1 ∨ -b^{9, 67}_0 ∨ false 
c  in DIMACS:
-10844 -10845 -10846  0

c i = 68
c  -2+1 --> -1
c    ( b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧  p_612) -> ( b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0)
c  in CNF:
c    -b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨  b^{9, 69}_2
c    -b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_1
c    -b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨  b^{9, 69}_0
c  in DIMACS:
-10847 -10848  10849 -612  10850 0
-10847 -10848  10849 -612 -10851 0
-10847 -10848  10849 -612  10852 0

c  -1+1 --> 0
c    ( b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0 ∧  p_612) -> (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧ -b^{9, 69}_0)
c  in CNF:
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_2
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_1
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_0
c  in DIMACS:
-10847  10848 -10849 -612 -10850 0
-10847  10848 -10849 -612 -10851 0
-10847  10848 -10849 -612 -10852 0

c  0+1 --> 1
c    (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧  p_612) -> (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0)
c  in CNF:
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_2
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_1
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨  b^{9, 69}_0
c  in DIMACS:
 10847  10848  10849 -612 -10850 0
 10847  10848  10849 -612 -10851 0
 10847  10848  10849 -612  10852 0

c  1+1 --> 2
c    (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0 ∧  p_612) -> (-b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0)
c  in CNF:
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_2
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨  b^{9, 69}_1
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ -p_612 ∨ -b^{9, 69}_0
c  in DIMACS:
 10847  10848 -10849 -612 -10850 0
 10847  10848 -10849 -612  10851 0
 10847  10848 -10849 -612 -10852 0

c  2+1 --> break 
c    (-b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧  p_612) -> break
c  in CNF:
c     b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 10847 -10848  10849 -612 1162 0


c  2-1 --> 1
c    (-b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧ -p_612) -> (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0)
c  in CNF:
c     b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_2
c     b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_1
c     b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨  b^{9, 69}_0
c  in DIMACS:
 10847 -10848  10849  612 -10850 0
 10847 -10848  10849  612 -10851 0
 10847 -10848  10849  612  10852 0

c  1-1 --> 0
c    (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0 ∧ -p_612) -> (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧ -b^{9, 69}_0)
c  in CNF:
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_2
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_1
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_0
c  in DIMACS:
 10847  10848 -10849  612 -10850 0
 10847  10848 -10849  612 -10851 0
 10847  10848 -10849  612 -10852 0

c  0-1 --> -1
c    (-b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧ -p_612) -> ( b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0)
c  in CNF:
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨  b^{9, 69}_2
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_1
c     b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨  b^{9, 69}_0
c  in DIMACS:
 10847  10848  10849  612  10850 0
 10847  10848  10849  612 -10851 0
 10847  10848  10849  612  10852 0

c  -1-1 --> -2
c    ( b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧  b^{9, 68}_0 ∧ -p_612) -> ( b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0)
c  in CNF:
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨  b^{9, 69}_2
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨  b^{9, 69}_1
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨  p_612 ∨ -b^{9, 69}_0
c  in DIMACS:
-10847  10848 -10849  612  10850 0
-10847  10848 -10849  612  10851 0
-10847  10848 -10849  612 -10852 0

c  -2-1 --> break 
c    ( b^{9, 68}_2 ∧  b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨  b^{9, 68}_0 ∨  p_612 ∨ break
c  in DIMACS:
-10847 -10848  10849  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 68}_2 ∧ -b^{9, 68}_1 ∧ -b^{9, 68}_0 ∧ true) 
c  in CNF:
c    -b^{9, 68}_2 ∨  b^{9, 68}_1 ∨  b^{9, 68}_0 ∨ false 
c  in DIMACS:
-10847  10848  10849  0

c  3 does not represent an automaton state.
c    -(-b^{9, 68}_2 ∧  b^{9, 68}_1 ∧  b^{9, 68}_0 ∧ true) 
c  in CNF:
c     b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ false 
c  in DIMACS:
 10847 -10848 -10849  0
c  -3 does not represent an automaton state.
c    -( b^{9, 68}_2 ∧  b^{9, 68}_1 ∧  b^{9, 68}_0 ∧ true) 
c  in CNF:
c    -b^{9, 68}_2 ∨ -b^{9, 68}_1 ∨ -b^{9, 68}_0 ∨ false 
c  in DIMACS:
-10847 -10848 -10849  0

c i = 69
c  -2+1 --> -1
c    ( b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧  p_621) -> ( b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0)
c  in CNF:
c    -b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨  b^{9, 70}_2
c    -b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_1
c    -b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨  b^{9, 70}_0
c  in DIMACS:
-10850 -10851  10852 -621  10853 0
-10850 -10851  10852 -621 -10854 0
-10850 -10851  10852 -621  10855 0

c  -1+1 --> 0
c    ( b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0 ∧  p_621) -> (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧ -b^{9, 70}_0)
c  in CNF:
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_2
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_1
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_0
c  in DIMACS:
-10850  10851 -10852 -621 -10853 0
-10850  10851 -10852 -621 -10854 0
-10850  10851 -10852 -621 -10855 0

c  0+1 --> 1
c    (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧  p_621) -> (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0)
c  in CNF:
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_2
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_1
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨  b^{9, 70}_0
c  in DIMACS:
 10850  10851  10852 -621 -10853 0
 10850  10851  10852 -621 -10854 0
 10850  10851  10852 -621  10855 0

c  1+1 --> 2
c    (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0 ∧  p_621) -> (-b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0)
c  in CNF:
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_2
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨  b^{9, 70}_1
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ -p_621 ∨ -b^{9, 70}_0
c  in DIMACS:
 10850  10851 -10852 -621 -10853 0
 10850  10851 -10852 -621  10854 0
 10850  10851 -10852 -621 -10855 0

c  2+1 --> break 
c    (-b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧  p_621) -> break
c  in CNF:
c     b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 10850 -10851  10852 -621 1162 0


c  2-1 --> 1
c    (-b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧ -p_621) -> (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0)
c  in CNF:
c     b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_2
c     b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_1
c     b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨  b^{9, 70}_0
c  in DIMACS:
 10850 -10851  10852  621 -10853 0
 10850 -10851  10852  621 -10854 0
 10850 -10851  10852  621  10855 0

c  1-1 --> 0
c    (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0 ∧ -p_621) -> (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧ -b^{9, 70}_0)
c  in CNF:
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_2
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_1
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_0
c  in DIMACS:
 10850  10851 -10852  621 -10853 0
 10850  10851 -10852  621 -10854 0
 10850  10851 -10852  621 -10855 0

c  0-1 --> -1
c    (-b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧ -p_621) -> ( b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0)
c  in CNF:
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨  b^{9, 70}_2
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_1
c     b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨  b^{9, 70}_0
c  in DIMACS:
 10850  10851  10852  621  10853 0
 10850  10851  10852  621 -10854 0
 10850  10851  10852  621  10855 0

c  -1-1 --> -2
c    ( b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧  b^{9, 69}_0 ∧ -p_621) -> ( b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0)
c  in CNF:
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨  b^{9, 70}_2
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨  b^{9, 70}_1
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨  p_621 ∨ -b^{9, 70}_0
c  in DIMACS:
-10850  10851 -10852  621  10853 0
-10850  10851 -10852  621  10854 0
-10850  10851 -10852  621 -10855 0

c  -2-1 --> break 
c    ( b^{9, 69}_2 ∧  b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨  b^{9, 69}_0 ∨  p_621 ∨ break
c  in DIMACS:
-10850 -10851  10852  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 69}_2 ∧ -b^{9, 69}_1 ∧ -b^{9, 69}_0 ∧ true) 
c  in CNF:
c    -b^{9, 69}_2 ∨  b^{9, 69}_1 ∨  b^{9, 69}_0 ∨ false 
c  in DIMACS:
-10850  10851  10852  0

c  3 does not represent an automaton state.
c    -(-b^{9, 69}_2 ∧  b^{9, 69}_1 ∧  b^{9, 69}_0 ∧ true) 
c  in CNF:
c     b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ false 
c  in DIMACS:
 10850 -10851 -10852  0
c  -3 does not represent an automaton state.
c    -( b^{9, 69}_2 ∧  b^{9, 69}_1 ∧  b^{9, 69}_0 ∧ true) 
c  in CNF:
c    -b^{9, 69}_2 ∨ -b^{9, 69}_1 ∨ -b^{9, 69}_0 ∨ false 
c  in DIMACS:
-10850 -10851 -10852  0

c i = 70
c  -2+1 --> -1
c    ( b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧  p_630) -> ( b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0)
c  in CNF:
c    -b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨  b^{9, 71}_2
c    -b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_1
c    -b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨  b^{9, 71}_0
c  in DIMACS:
-10853 -10854  10855 -630  10856 0
-10853 -10854  10855 -630 -10857 0
-10853 -10854  10855 -630  10858 0

c  -1+1 --> 0
c    ( b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0 ∧  p_630) -> (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧ -b^{9, 71}_0)
c  in CNF:
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_2
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_1
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_0
c  in DIMACS:
-10853  10854 -10855 -630 -10856 0
-10853  10854 -10855 -630 -10857 0
-10853  10854 -10855 -630 -10858 0

c  0+1 --> 1
c    (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧  p_630) -> (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0)
c  in CNF:
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_2
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_1
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨  b^{9, 71}_0
c  in DIMACS:
 10853  10854  10855 -630 -10856 0
 10853  10854  10855 -630 -10857 0
 10853  10854  10855 -630  10858 0

c  1+1 --> 2
c    (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0 ∧  p_630) -> (-b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0)
c  in CNF:
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_2
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨  b^{9, 71}_1
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ -p_630 ∨ -b^{9, 71}_0
c  in DIMACS:
 10853  10854 -10855 -630 -10856 0
 10853  10854 -10855 -630  10857 0
 10853  10854 -10855 -630 -10858 0

c  2+1 --> break 
c    (-b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧  p_630) -> break
c  in CNF:
c     b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 10853 -10854  10855 -630 1162 0


c  2-1 --> 1
c    (-b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧ -p_630) -> (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0)
c  in CNF:
c     b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_2
c     b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_1
c     b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨  b^{9, 71}_0
c  in DIMACS:
 10853 -10854  10855  630 -10856 0
 10853 -10854  10855  630 -10857 0
 10853 -10854  10855  630  10858 0

c  1-1 --> 0
c    (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0 ∧ -p_630) -> (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧ -b^{9, 71}_0)
c  in CNF:
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_2
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_1
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_0
c  in DIMACS:
 10853  10854 -10855  630 -10856 0
 10853  10854 -10855  630 -10857 0
 10853  10854 -10855  630 -10858 0

c  0-1 --> -1
c    (-b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧ -p_630) -> ( b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0)
c  in CNF:
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨  b^{9, 71}_2
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_1
c     b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨  b^{9, 71}_0
c  in DIMACS:
 10853  10854  10855  630  10856 0
 10853  10854  10855  630 -10857 0
 10853  10854  10855  630  10858 0

c  -1-1 --> -2
c    ( b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧  b^{9, 70}_0 ∧ -p_630) -> ( b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0)
c  in CNF:
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨  b^{9, 71}_2
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨  b^{9, 71}_1
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨  p_630 ∨ -b^{9, 71}_0
c  in DIMACS:
-10853  10854 -10855  630  10856 0
-10853  10854 -10855  630  10857 0
-10853  10854 -10855  630 -10858 0

c  -2-1 --> break 
c    ( b^{9, 70}_2 ∧  b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨  b^{9, 70}_0 ∨  p_630 ∨ break
c  in DIMACS:
-10853 -10854  10855  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 70}_2 ∧ -b^{9, 70}_1 ∧ -b^{9, 70}_0 ∧ true) 
c  in CNF:
c    -b^{9, 70}_2 ∨  b^{9, 70}_1 ∨  b^{9, 70}_0 ∨ false 
c  in DIMACS:
-10853  10854  10855  0

c  3 does not represent an automaton state.
c    -(-b^{9, 70}_2 ∧  b^{9, 70}_1 ∧  b^{9, 70}_0 ∧ true) 
c  in CNF:
c     b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ false 
c  in DIMACS:
 10853 -10854 -10855  0
c  -3 does not represent an automaton state.
c    -( b^{9, 70}_2 ∧  b^{9, 70}_1 ∧  b^{9, 70}_0 ∧ true) 
c  in CNF:
c    -b^{9, 70}_2 ∨ -b^{9, 70}_1 ∨ -b^{9, 70}_0 ∨ false 
c  in DIMACS:
-10853 -10854 -10855  0

c i = 71
c  -2+1 --> -1
c    ( b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧  p_639) -> ( b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0)
c  in CNF:
c    -b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨  b^{9, 72}_2
c    -b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_1
c    -b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨  b^{9, 72}_0
c  in DIMACS:
-10856 -10857  10858 -639  10859 0
-10856 -10857  10858 -639 -10860 0
-10856 -10857  10858 -639  10861 0

c  -1+1 --> 0
c    ( b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0 ∧  p_639) -> (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧ -b^{9, 72}_0)
c  in CNF:
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_2
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_1
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_0
c  in DIMACS:
-10856  10857 -10858 -639 -10859 0
-10856  10857 -10858 -639 -10860 0
-10856  10857 -10858 -639 -10861 0

c  0+1 --> 1
c    (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧  p_639) -> (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0)
c  in CNF:
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_2
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_1
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨  b^{9, 72}_0
c  in DIMACS:
 10856  10857  10858 -639 -10859 0
 10856  10857  10858 -639 -10860 0
 10856  10857  10858 -639  10861 0

c  1+1 --> 2
c    (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0 ∧  p_639) -> (-b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0)
c  in CNF:
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_2
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨  b^{9, 72}_1
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ -p_639 ∨ -b^{9, 72}_0
c  in DIMACS:
 10856  10857 -10858 -639 -10859 0
 10856  10857 -10858 -639  10860 0
 10856  10857 -10858 -639 -10861 0

c  2+1 --> break 
c    (-b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧  p_639) -> break
c  in CNF:
c     b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ -p_639 ∨ break
c  in DIMACS:
 10856 -10857  10858 -639 1162 0


c  2-1 --> 1
c    (-b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧ -p_639) -> (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0)
c  in CNF:
c     b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_2
c     b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_1
c     b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨  b^{9, 72}_0
c  in DIMACS:
 10856 -10857  10858  639 -10859 0
 10856 -10857  10858  639 -10860 0
 10856 -10857  10858  639  10861 0

c  1-1 --> 0
c    (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0 ∧ -p_639) -> (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧ -b^{9, 72}_0)
c  in CNF:
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_2
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_1
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_0
c  in DIMACS:
 10856  10857 -10858  639 -10859 0
 10856  10857 -10858  639 -10860 0
 10856  10857 -10858  639 -10861 0

c  0-1 --> -1
c    (-b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧ -p_639) -> ( b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0)
c  in CNF:
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨  b^{9, 72}_2
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_1
c     b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨  b^{9, 72}_0
c  in DIMACS:
 10856  10857  10858  639  10859 0
 10856  10857  10858  639 -10860 0
 10856  10857  10858  639  10861 0

c  -1-1 --> -2
c    ( b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧  b^{9, 71}_0 ∧ -p_639) -> ( b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0)
c  in CNF:
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨  b^{9, 72}_2
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨  b^{9, 72}_1
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨  p_639 ∨ -b^{9, 72}_0
c  in DIMACS:
-10856  10857 -10858  639  10859 0
-10856  10857 -10858  639  10860 0
-10856  10857 -10858  639 -10861 0

c  -2-1 --> break 
c    ( b^{9, 71}_2 ∧  b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧ -p_639) -> break
c  in CNF:
c    -b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨  b^{9, 71}_0 ∨  p_639 ∨ break
c  in DIMACS:
-10856 -10857  10858  639 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 71}_2 ∧ -b^{9, 71}_1 ∧ -b^{9, 71}_0 ∧ true) 
c  in CNF:
c    -b^{9, 71}_2 ∨  b^{9, 71}_1 ∨  b^{9, 71}_0 ∨ false 
c  in DIMACS:
-10856  10857  10858  0

c  3 does not represent an automaton state.
c    -(-b^{9, 71}_2 ∧  b^{9, 71}_1 ∧  b^{9, 71}_0 ∧ true) 
c  in CNF:
c     b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ false 
c  in DIMACS:
 10856 -10857 -10858  0
c  -3 does not represent an automaton state.
c    -( b^{9, 71}_2 ∧  b^{9, 71}_1 ∧  b^{9, 71}_0 ∧ true) 
c  in CNF:
c    -b^{9, 71}_2 ∨ -b^{9, 71}_1 ∨ -b^{9, 71}_0 ∨ false 
c  in DIMACS:
-10856 -10857 -10858  0

c i = 72
c  -2+1 --> -1
c    ( b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧  p_648) -> ( b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0)
c  in CNF:
c    -b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨  b^{9, 73}_2
c    -b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_1
c    -b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨  b^{9, 73}_0
c  in DIMACS:
-10859 -10860  10861 -648  10862 0
-10859 -10860  10861 -648 -10863 0
-10859 -10860  10861 -648  10864 0

c  -1+1 --> 0
c    ( b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0 ∧  p_648) -> (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧ -b^{9, 73}_0)
c  in CNF:
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_2
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_1
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_0
c  in DIMACS:
-10859  10860 -10861 -648 -10862 0
-10859  10860 -10861 -648 -10863 0
-10859  10860 -10861 -648 -10864 0

c  0+1 --> 1
c    (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧  p_648) -> (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0)
c  in CNF:
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_2
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_1
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨  b^{9, 73}_0
c  in DIMACS:
 10859  10860  10861 -648 -10862 0
 10859  10860  10861 -648 -10863 0
 10859  10860  10861 -648  10864 0

c  1+1 --> 2
c    (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0 ∧  p_648) -> (-b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0)
c  in CNF:
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_2
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨  b^{9, 73}_1
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ -p_648 ∨ -b^{9, 73}_0
c  in DIMACS:
 10859  10860 -10861 -648 -10862 0
 10859  10860 -10861 -648  10863 0
 10859  10860 -10861 -648 -10864 0

c  2+1 --> break 
c    (-b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧  p_648) -> break
c  in CNF:
c     b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 10859 -10860  10861 -648 1162 0


c  2-1 --> 1
c    (-b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧ -p_648) -> (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0)
c  in CNF:
c     b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_2
c     b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_1
c     b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨  b^{9, 73}_0
c  in DIMACS:
 10859 -10860  10861  648 -10862 0
 10859 -10860  10861  648 -10863 0
 10859 -10860  10861  648  10864 0

c  1-1 --> 0
c    (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0 ∧ -p_648) -> (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧ -b^{9, 73}_0)
c  in CNF:
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_2
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_1
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_0
c  in DIMACS:
 10859  10860 -10861  648 -10862 0
 10859  10860 -10861  648 -10863 0
 10859  10860 -10861  648 -10864 0

c  0-1 --> -1
c    (-b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧ -p_648) -> ( b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0)
c  in CNF:
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨  b^{9, 73}_2
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_1
c     b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨  b^{9, 73}_0
c  in DIMACS:
 10859  10860  10861  648  10862 0
 10859  10860  10861  648 -10863 0
 10859  10860  10861  648  10864 0

c  -1-1 --> -2
c    ( b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧  b^{9, 72}_0 ∧ -p_648) -> ( b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0)
c  in CNF:
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨  b^{9, 73}_2
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨  b^{9, 73}_1
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨  p_648 ∨ -b^{9, 73}_0
c  in DIMACS:
-10859  10860 -10861  648  10862 0
-10859  10860 -10861  648  10863 0
-10859  10860 -10861  648 -10864 0

c  -2-1 --> break 
c    ( b^{9, 72}_2 ∧  b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨  b^{9, 72}_0 ∨  p_648 ∨ break
c  in DIMACS:
-10859 -10860  10861  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 72}_2 ∧ -b^{9, 72}_1 ∧ -b^{9, 72}_0 ∧ true) 
c  in CNF:
c    -b^{9, 72}_2 ∨  b^{9, 72}_1 ∨  b^{9, 72}_0 ∨ false 
c  in DIMACS:
-10859  10860  10861  0

c  3 does not represent an automaton state.
c    -(-b^{9, 72}_2 ∧  b^{9, 72}_1 ∧  b^{9, 72}_0 ∧ true) 
c  in CNF:
c     b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ false 
c  in DIMACS:
 10859 -10860 -10861  0
c  -3 does not represent an automaton state.
c    -( b^{9, 72}_2 ∧  b^{9, 72}_1 ∧  b^{9, 72}_0 ∧ true) 
c  in CNF:
c    -b^{9, 72}_2 ∨ -b^{9, 72}_1 ∨ -b^{9, 72}_0 ∨ false 
c  in DIMACS:
-10859 -10860 -10861  0

c i = 73
c  -2+1 --> -1
c    ( b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧  p_657) -> ( b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0)
c  in CNF:
c    -b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨  b^{9, 74}_2
c    -b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_1
c    -b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨  b^{9, 74}_0
c  in DIMACS:
-10862 -10863  10864 -657  10865 0
-10862 -10863  10864 -657 -10866 0
-10862 -10863  10864 -657  10867 0

c  -1+1 --> 0
c    ( b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0 ∧  p_657) -> (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧ -b^{9, 74}_0)
c  in CNF:
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_2
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_1
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_0
c  in DIMACS:
-10862  10863 -10864 -657 -10865 0
-10862  10863 -10864 -657 -10866 0
-10862  10863 -10864 -657 -10867 0

c  0+1 --> 1
c    (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧  p_657) -> (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0)
c  in CNF:
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_2
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_1
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨  b^{9, 74}_0
c  in DIMACS:
 10862  10863  10864 -657 -10865 0
 10862  10863  10864 -657 -10866 0
 10862  10863  10864 -657  10867 0

c  1+1 --> 2
c    (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0 ∧  p_657) -> (-b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0)
c  in CNF:
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_2
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨  b^{9, 74}_1
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ -p_657 ∨ -b^{9, 74}_0
c  in DIMACS:
 10862  10863 -10864 -657 -10865 0
 10862  10863 -10864 -657  10866 0
 10862  10863 -10864 -657 -10867 0

c  2+1 --> break 
c    (-b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧  p_657) -> break
c  in CNF:
c     b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ -p_657 ∨ break
c  in DIMACS:
 10862 -10863  10864 -657 1162 0


c  2-1 --> 1
c    (-b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧ -p_657) -> (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0)
c  in CNF:
c     b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_2
c     b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_1
c     b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨  b^{9, 74}_0
c  in DIMACS:
 10862 -10863  10864  657 -10865 0
 10862 -10863  10864  657 -10866 0
 10862 -10863  10864  657  10867 0

c  1-1 --> 0
c    (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0 ∧ -p_657) -> (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧ -b^{9, 74}_0)
c  in CNF:
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_2
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_1
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_0
c  in DIMACS:
 10862  10863 -10864  657 -10865 0
 10862  10863 -10864  657 -10866 0
 10862  10863 -10864  657 -10867 0

c  0-1 --> -1
c    (-b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧ -p_657) -> ( b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0)
c  in CNF:
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨  b^{9, 74}_2
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_1
c     b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨  b^{9, 74}_0
c  in DIMACS:
 10862  10863  10864  657  10865 0
 10862  10863  10864  657 -10866 0
 10862  10863  10864  657  10867 0

c  -1-1 --> -2
c    ( b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧  b^{9, 73}_0 ∧ -p_657) -> ( b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0)
c  in CNF:
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨  b^{9, 74}_2
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨  b^{9, 74}_1
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨  p_657 ∨ -b^{9, 74}_0
c  in DIMACS:
-10862  10863 -10864  657  10865 0
-10862  10863 -10864  657  10866 0
-10862  10863 -10864  657 -10867 0

c  -2-1 --> break 
c    ( b^{9, 73}_2 ∧  b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧ -p_657) -> break
c  in CNF:
c    -b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨  b^{9, 73}_0 ∨  p_657 ∨ break
c  in DIMACS:
-10862 -10863  10864  657 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 73}_2 ∧ -b^{9, 73}_1 ∧ -b^{9, 73}_0 ∧ true) 
c  in CNF:
c    -b^{9, 73}_2 ∨  b^{9, 73}_1 ∨  b^{9, 73}_0 ∨ false 
c  in DIMACS:
-10862  10863  10864  0

c  3 does not represent an automaton state.
c    -(-b^{9, 73}_2 ∧  b^{9, 73}_1 ∧  b^{9, 73}_0 ∧ true) 
c  in CNF:
c     b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ false 
c  in DIMACS:
 10862 -10863 -10864  0
c  -3 does not represent an automaton state.
c    -( b^{9, 73}_2 ∧  b^{9, 73}_1 ∧  b^{9, 73}_0 ∧ true) 
c  in CNF:
c    -b^{9, 73}_2 ∨ -b^{9, 73}_1 ∨ -b^{9, 73}_0 ∨ false 
c  in DIMACS:
-10862 -10863 -10864  0

c i = 74
c  -2+1 --> -1
c    ( b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧  p_666) -> ( b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0)
c  in CNF:
c    -b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨  b^{9, 75}_2
c    -b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_1
c    -b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨  b^{9, 75}_0
c  in DIMACS:
-10865 -10866  10867 -666  10868 0
-10865 -10866  10867 -666 -10869 0
-10865 -10866  10867 -666  10870 0

c  -1+1 --> 0
c    ( b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0 ∧  p_666) -> (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧ -b^{9, 75}_0)
c  in CNF:
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_2
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_1
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_0
c  in DIMACS:
-10865  10866 -10867 -666 -10868 0
-10865  10866 -10867 -666 -10869 0
-10865  10866 -10867 -666 -10870 0

c  0+1 --> 1
c    (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧  p_666) -> (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0)
c  in CNF:
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_2
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_1
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨  b^{9, 75}_0
c  in DIMACS:
 10865  10866  10867 -666 -10868 0
 10865  10866  10867 -666 -10869 0
 10865  10866  10867 -666  10870 0

c  1+1 --> 2
c    (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0 ∧  p_666) -> (-b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0)
c  in CNF:
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_2
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨  b^{9, 75}_1
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ -p_666 ∨ -b^{9, 75}_0
c  in DIMACS:
 10865  10866 -10867 -666 -10868 0
 10865  10866 -10867 -666  10869 0
 10865  10866 -10867 -666 -10870 0

c  2+1 --> break 
c    (-b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧  p_666) -> break
c  in CNF:
c     b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 10865 -10866  10867 -666 1162 0


c  2-1 --> 1
c    (-b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧ -p_666) -> (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0)
c  in CNF:
c     b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_2
c     b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_1
c     b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨  b^{9, 75}_0
c  in DIMACS:
 10865 -10866  10867  666 -10868 0
 10865 -10866  10867  666 -10869 0
 10865 -10866  10867  666  10870 0

c  1-1 --> 0
c    (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0 ∧ -p_666) -> (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧ -b^{9, 75}_0)
c  in CNF:
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_2
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_1
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_0
c  in DIMACS:
 10865  10866 -10867  666 -10868 0
 10865  10866 -10867  666 -10869 0
 10865  10866 -10867  666 -10870 0

c  0-1 --> -1
c    (-b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧ -p_666) -> ( b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0)
c  in CNF:
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨  b^{9, 75}_2
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_1
c     b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨  b^{9, 75}_0
c  in DIMACS:
 10865  10866  10867  666  10868 0
 10865  10866  10867  666 -10869 0
 10865  10866  10867  666  10870 0

c  -1-1 --> -2
c    ( b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧  b^{9, 74}_0 ∧ -p_666) -> ( b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0)
c  in CNF:
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨  b^{9, 75}_2
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨  b^{9, 75}_1
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨  p_666 ∨ -b^{9, 75}_0
c  in DIMACS:
-10865  10866 -10867  666  10868 0
-10865  10866 -10867  666  10869 0
-10865  10866 -10867  666 -10870 0

c  -2-1 --> break 
c    ( b^{9, 74}_2 ∧  b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨  b^{9, 74}_0 ∨  p_666 ∨ break
c  in DIMACS:
-10865 -10866  10867  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 74}_2 ∧ -b^{9, 74}_1 ∧ -b^{9, 74}_0 ∧ true) 
c  in CNF:
c    -b^{9, 74}_2 ∨  b^{9, 74}_1 ∨  b^{9, 74}_0 ∨ false 
c  in DIMACS:
-10865  10866  10867  0

c  3 does not represent an automaton state.
c    -(-b^{9, 74}_2 ∧  b^{9, 74}_1 ∧  b^{9, 74}_0 ∧ true) 
c  in CNF:
c     b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ false 
c  in DIMACS:
 10865 -10866 -10867  0
c  -3 does not represent an automaton state.
c    -( b^{9, 74}_2 ∧  b^{9, 74}_1 ∧  b^{9, 74}_0 ∧ true) 
c  in CNF:
c    -b^{9, 74}_2 ∨ -b^{9, 74}_1 ∨ -b^{9, 74}_0 ∨ false 
c  in DIMACS:
-10865 -10866 -10867  0

c i = 75
c  -2+1 --> -1
c    ( b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧  p_675) -> ( b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0)
c  in CNF:
c    -b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨  b^{9, 76}_2
c    -b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_1
c    -b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨  b^{9, 76}_0
c  in DIMACS:
-10868 -10869  10870 -675  10871 0
-10868 -10869  10870 -675 -10872 0
-10868 -10869  10870 -675  10873 0

c  -1+1 --> 0
c    ( b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0 ∧  p_675) -> (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧ -b^{9, 76}_0)
c  in CNF:
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_2
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_1
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_0
c  in DIMACS:
-10868  10869 -10870 -675 -10871 0
-10868  10869 -10870 -675 -10872 0
-10868  10869 -10870 -675 -10873 0

c  0+1 --> 1
c    (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧  p_675) -> (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0)
c  in CNF:
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_2
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_1
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨  b^{9, 76}_0
c  in DIMACS:
 10868  10869  10870 -675 -10871 0
 10868  10869  10870 -675 -10872 0
 10868  10869  10870 -675  10873 0

c  1+1 --> 2
c    (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0 ∧  p_675) -> (-b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0)
c  in CNF:
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_2
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨  b^{9, 76}_1
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ -p_675 ∨ -b^{9, 76}_0
c  in DIMACS:
 10868  10869 -10870 -675 -10871 0
 10868  10869 -10870 -675  10872 0
 10868  10869 -10870 -675 -10873 0

c  2+1 --> break 
c    (-b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧  p_675) -> break
c  in CNF:
c     b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 10868 -10869  10870 -675 1162 0


c  2-1 --> 1
c    (-b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧ -p_675) -> (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0)
c  in CNF:
c     b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_2
c     b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_1
c     b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨  b^{9, 76}_0
c  in DIMACS:
 10868 -10869  10870  675 -10871 0
 10868 -10869  10870  675 -10872 0
 10868 -10869  10870  675  10873 0

c  1-1 --> 0
c    (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0 ∧ -p_675) -> (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧ -b^{9, 76}_0)
c  in CNF:
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_2
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_1
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_0
c  in DIMACS:
 10868  10869 -10870  675 -10871 0
 10868  10869 -10870  675 -10872 0
 10868  10869 -10870  675 -10873 0

c  0-1 --> -1
c    (-b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧ -p_675) -> ( b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0)
c  in CNF:
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨  b^{9, 76}_2
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_1
c     b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨  b^{9, 76}_0
c  in DIMACS:
 10868  10869  10870  675  10871 0
 10868  10869  10870  675 -10872 0
 10868  10869  10870  675  10873 0

c  -1-1 --> -2
c    ( b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧  b^{9, 75}_0 ∧ -p_675) -> ( b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0)
c  in CNF:
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨  b^{9, 76}_2
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨  b^{9, 76}_1
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨  p_675 ∨ -b^{9, 76}_0
c  in DIMACS:
-10868  10869 -10870  675  10871 0
-10868  10869 -10870  675  10872 0
-10868  10869 -10870  675 -10873 0

c  -2-1 --> break 
c    ( b^{9, 75}_2 ∧  b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨  b^{9, 75}_0 ∨  p_675 ∨ break
c  in DIMACS:
-10868 -10869  10870  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 75}_2 ∧ -b^{9, 75}_1 ∧ -b^{9, 75}_0 ∧ true) 
c  in CNF:
c    -b^{9, 75}_2 ∨  b^{9, 75}_1 ∨  b^{9, 75}_0 ∨ false 
c  in DIMACS:
-10868  10869  10870  0

c  3 does not represent an automaton state.
c    -(-b^{9, 75}_2 ∧  b^{9, 75}_1 ∧  b^{9, 75}_0 ∧ true) 
c  in CNF:
c     b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ false 
c  in DIMACS:
 10868 -10869 -10870  0
c  -3 does not represent an automaton state.
c    -( b^{9, 75}_2 ∧  b^{9, 75}_1 ∧  b^{9, 75}_0 ∧ true) 
c  in CNF:
c    -b^{9, 75}_2 ∨ -b^{9, 75}_1 ∨ -b^{9, 75}_0 ∨ false 
c  in DIMACS:
-10868 -10869 -10870  0

c i = 76
c  -2+1 --> -1
c    ( b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧  p_684) -> ( b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0)
c  in CNF:
c    -b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨  b^{9, 77}_2
c    -b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_1
c    -b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨  b^{9, 77}_0
c  in DIMACS:
-10871 -10872  10873 -684  10874 0
-10871 -10872  10873 -684 -10875 0
-10871 -10872  10873 -684  10876 0

c  -1+1 --> 0
c    ( b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0 ∧  p_684) -> (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧ -b^{9, 77}_0)
c  in CNF:
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_2
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_1
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_0
c  in DIMACS:
-10871  10872 -10873 -684 -10874 0
-10871  10872 -10873 -684 -10875 0
-10871  10872 -10873 -684 -10876 0

c  0+1 --> 1
c    (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧  p_684) -> (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0)
c  in CNF:
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_2
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_1
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨  b^{9, 77}_0
c  in DIMACS:
 10871  10872  10873 -684 -10874 0
 10871  10872  10873 -684 -10875 0
 10871  10872  10873 -684  10876 0

c  1+1 --> 2
c    (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0 ∧  p_684) -> (-b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0)
c  in CNF:
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_2
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨  b^{9, 77}_1
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ -p_684 ∨ -b^{9, 77}_0
c  in DIMACS:
 10871  10872 -10873 -684 -10874 0
 10871  10872 -10873 -684  10875 0
 10871  10872 -10873 -684 -10876 0

c  2+1 --> break 
c    (-b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧  p_684) -> break
c  in CNF:
c     b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 10871 -10872  10873 -684 1162 0


c  2-1 --> 1
c    (-b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧ -p_684) -> (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0)
c  in CNF:
c     b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_2
c     b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_1
c     b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨  b^{9, 77}_0
c  in DIMACS:
 10871 -10872  10873  684 -10874 0
 10871 -10872  10873  684 -10875 0
 10871 -10872  10873  684  10876 0

c  1-1 --> 0
c    (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0 ∧ -p_684) -> (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧ -b^{9, 77}_0)
c  in CNF:
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_2
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_1
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_0
c  in DIMACS:
 10871  10872 -10873  684 -10874 0
 10871  10872 -10873  684 -10875 0
 10871  10872 -10873  684 -10876 0

c  0-1 --> -1
c    (-b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧ -p_684) -> ( b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0)
c  in CNF:
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨  b^{9, 77}_2
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_1
c     b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨  b^{9, 77}_0
c  in DIMACS:
 10871  10872  10873  684  10874 0
 10871  10872  10873  684 -10875 0
 10871  10872  10873  684  10876 0

c  -1-1 --> -2
c    ( b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧  b^{9, 76}_0 ∧ -p_684) -> ( b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0)
c  in CNF:
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨  b^{9, 77}_2
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨  b^{9, 77}_1
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨  p_684 ∨ -b^{9, 77}_0
c  in DIMACS:
-10871  10872 -10873  684  10874 0
-10871  10872 -10873  684  10875 0
-10871  10872 -10873  684 -10876 0

c  -2-1 --> break 
c    ( b^{9, 76}_2 ∧  b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨  b^{9, 76}_0 ∨  p_684 ∨ break
c  in DIMACS:
-10871 -10872  10873  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 76}_2 ∧ -b^{9, 76}_1 ∧ -b^{9, 76}_0 ∧ true) 
c  in CNF:
c    -b^{9, 76}_2 ∨  b^{9, 76}_1 ∨  b^{9, 76}_0 ∨ false 
c  in DIMACS:
-10871  10872  10873  0

c  3 does not represent an automaton state.
c    -(-b^{9, 76}_2 ∧  b^{9, 76}_1 ∧  b^{9, 76}_0 ∧ true) 
c  in CNF:
c     b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ false 
c  in DIMACS:
 10871 -10872 -10873  0
c  -3 does not represent an automaton state.
c    -( b^{9, 76}_2 ∧  b^{9, 76}_1 ∧  b^{9, 76}_0 ∧ true) 
c  in CNF:
c    -b^{9, 76}_2 ∨ -b^{9, 76}_1 ∨ -b^{9, 76}_0 ∨ false 
c  in DIMACS:
-10871 -10872 -10873  0

c i = 77
c  -2+1 --> -1
c    ( b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧  p_693) -> ( b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0)
c  in CNF:
c    -b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨  b^{9, 78}_2
c    -b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_1
c    -b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨  b^{9, 78}_0
c  in DIMACS:
-10874 -10875  10876 -693  10877 0
-10874 -10875  10876 -693 -10878 0
-10874 -10875  10876 -693  10879 0

c  -1+1 --> 0
c    ( b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0 ∧  p_693) -> (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧ -b^{9, 78}_0)
c  in CNF:
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_2
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_1
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_0
c  in DIMACS:
-10874  10875 -10876 -693 -10877 0
-10874  10875 -10876 -693 -10878 0
-10874  10875 -10876 -693 -10879 0

c  0+1 --> 1
c    (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧  p_693) -> (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0)
c  in CNF:
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_2
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_1
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨  b^{9, 78}_0
c  in DIMACS:
 10874  10875  10876 -693 -10877 0
 10874  10875  10876 -693 -10878 0
 10874  10875  10876 -693  10879 0

c  1+1 --> 2
c    (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0 ∧  p_693) -> (-b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0)
c  in CNF:
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_2
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨  b^{9, 78}_1
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ -p_693 ∨ -b^{9, 78}_0
c  in DIMACS:
 10874  10875 -10876 -693 -10877 0
 10874  10875 -10876 -693  10878 0
 10874  10875 -10876 -693 -10879 0

c  2+1 --> break 
c    (-b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧  p_693) -> break
c  in CNF:
c     b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 10874 -10875  10876 -693 1162 0


c  2-1 --> 1
c    (-b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧ -p_693) -> (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0)
c  in CNF:
c     b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_2
c     b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_1
c     b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨  b^{9, 78}_0
c  in DIMACS:
 10874 -10875  10876  693 -10877 0
 10874 -10875  10876  693 -10878 0
 10874 -10875  10876  693  10879 0

c  1-1 --> 0
c    (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0 ∧ -p_693) -> (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧ -b^{9, 78}_0)
c  in CNF:
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_2
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_1
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_0
c  in DIMACS:
 10874  10875 -10876  693 -10877 0
 10874  10875 -10876  693 -10878 0
 10874  10875 -10876  693 -10879 0

c  0-1 --> -1
c    (-b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧ -p_693) -> ( b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0)
c  in CNF:
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨  b^{9, 78}_2
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_1
c     b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨  b^{9, 78}_0
c  in DIMACS:
 10874  10875  10876  693  10877 0
 10874  10875  10876  693 -10878 0
 10874  10875  10876  693  10879 0

c  -1-1 --> -2
c    ( b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧  b^{9, 77}_0 ∧ -p_693) -> ( b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0)
c  in CNF:
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨  b^{9, 78}_2
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨  b^{9, 78}_1
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨  p_693 ∨ -b^{9, 78}_0
c  in DIMACS:
-10874  10875 -10876  693  10877 0
-10874  10875 -10876  693  10878 0
-10874  10875 -10876  693 -10879 0

c  -2-1 --> break 
c    ( b^{9, 77}_2 ∧  b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨  b^{9, 77}_0 ∨  p_693 ∨ break
c  in DIMACS:
-10874 -10875  10876  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 77}_2 ∧ -b^{9, 77}_1 ∧ -b^{9, 77}_0 ∧ true) 
c  in CNF:
c    -b^{9, 77}_2 ∨  b^{9, 77}_1 ∨  b^{9, 77}_0 ∨ false 
c  in DIMACS:
-10874  10875  10876  0

c  3 does not represent an automaton state.
c    -(-b^{9, 77}_2 ∧  b^{9, 77}_1 ∧  b^{9, 77}_0 ∧ true) 
c  in CNF:
c     b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ false 
c  in DIMACS:
 10874 -10875 -10876  0
c  -3 does not represent an automaton state.
c    -( b^{9, 77}_2 ∧  b^{9, 77}_1 ∧  b^{9, 77}_0 ∧ true) 
c  in CNF:
c    -b^{9, 77}_2 ∨ -b^{9, 77}_1 ∨ -b^{9, 77}_0 ∨ false 
c  in DIMACS:
-10874 -10875 -10876  0

c i = 78
c  -2+1 --> -1
c    ( b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧  p_702) -> ( b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0)
c  in CNF:
c    -b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨  b^{9, 79}_2
c    -b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_1
c    -b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨  b^{9, 79}_0
c  in DIMACS:
-10877 -10878  10879 -702  10880 0
-10877 -10878  10879 -702 -10881 0
-10877 -10878  10879 -702  10882 0

c  -1+1 --> 0
c    ( b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0 ∧  p_702) -> (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧ -b^{9, 79}_0)
c  in CNF:
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_2
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_1
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_0
c  in DIMACS:
-10877  10878 -10879 -702 -10880 0
-10877  10878 -10879 -702 -10881 0
-10877  10878 -10879 -702 -10882 0

c  0+1 --> 1
c    (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧  p_702) -> (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0)
c  in CNF:
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_2
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_1
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨  b^{9, 79}_0
c  in DIMACS:
 10877  10878  10879 -702 -10880 0
 10877  10878  10879 -702 -10881 0
 10877  10878  10879 -702  10882 0

c  1+1 --> 2
c    (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0 ∧  p_702) -> (-b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0)
c  in CNF:
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_2
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨  b^{9, 79}_1
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ -p_702 ∨ -b^{9, 79}_0
c  in DIMACS:
 10877  10878 -10879 -702 -10880 0
 10877  10878 -10879 -702  10881 0
 10877  10878 -10879 -702 -10882 0

c  2+1 --> break 
c    (-b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧  p_702) -> break
c  in CNF:
c     b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 10877 -10878  10879 -702 1162 0


c  2-1 --> 1
c    (-b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧ -p_702) -> (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0)
c  in CNF:
c     b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_2
c     b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_1
c     b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨  b^{9, 79}_0
c  in DIMACS:
 10877 -10878  10879  702 -10880 0
 10877 -10878  10879  702 -10881 0
 10877 -10878  10879  702  10882 0

c  1-1 --> 0
c    (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0 ∧ -p_702) -> (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧ -b^{9, 79}_0)
c  in CNF:
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_2
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_1
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_0
c  in DIMACS:
 10877  10878 -10879  702 -10880 0
 10877  10878 -10879  702 -10881 0
 10877  10878 -10879  702 -10882 0

c  0-1 --> -1
c    (-b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧ -p_702) -> ( b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0)
c  in CNF:
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨  b^{9, 79}_2
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_1
c     b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨  b^{9, 79}_0
c  in DIMACS:
 10877  10878  10879  702  10880 0
 10877  10878  10879  702 -10881 0
 10877  10878  10879  702  10882 0

c  -1-1 --> -2
c    ( b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧  b^{9, 78}_0 ∧ -p_702) -> ( b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0)
c  in CNF:
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨  b^{9, 79}_2
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨  b^{9, 79}_1
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨  p_702 ∨ -b^{9, 79}_0
c  in DIMACS:
-10877  10878 -10879  702  10880 0
-10877  10878 -10879  702  10881 0
-10877  10878 -10879  702 -10882 0

c  -2-1 --> break 
c    ( b^{9, 78}_2 ∧  b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨  b^{9, 78}_0 ∨  p_702 ∨ break
c  in DIMACS:
-10877 -10878  10879  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 78}_2 ∧ -b^{9, 78}_1 ∧ -b^{9, 78}_0 ∧ true) 
c  in CNF:
c    -b^{9, 78}_2 ∨  b^{9, 78}_1 ∨  b^{9, 78}_0 ∨ false 
c  in DIMACS:
-10877  10878  10879  0

c  3 does not represent an automaton state.
c    -(-b^{9, 78}_2 ∧  b^{9, 78}_1 ∧  b^{9, 78}_0 ∧ true) 
c  in CNF:
c     b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ false 
c  in DIMACS:
 10877 -10878 -10879  0
c  -3 does not represent an automaton state.
c    -( b^{9, 78}_2 ∧  b^{9, 78}_1 ∧  b^{9, 78}_0 ∧ true) 
c  in CNF:
c    -b^{9, 78}_2 ∨ -b^{9, 78}_1 ∨ -b^{9, 78}_0 ∨ false 
c  in DIMACS:
-10877 -10878 -10879  0

c i = 79
c  -2+1 --> -1
c    ( b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧  p_711) -> ( b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0)
c  in CNF:
c    -b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨  b^{9, 80}_2
c    -b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_1
c    -b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨  b^{9, 80}_0
c  in DIMACS:
-10880 -10881  10882 -711  10883 0
-10880 -10881  10882 -711 -10884 0
-10880 -10881  10882 -711  10885 0

c  -1+1 --> 0
c    ( b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0 ∧  p_711) -> (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧ -b^{9, 80}_0)
c  in CNF:
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_2
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_1
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_0
c  in DIMACS:
-10880  10881 -10882 -711 -10883 0
-10880  10881 -10882 -711 -10884 0
-10880  10881 -10882 -711 -10885 0

c  0+1 --> 1
c    (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧  p_711) -> (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0)
c  in CNF:
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_2
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_1
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨  b^{9, 80}_0
c  in DIMACS:
 10880  10881  10882 -711 -10883 0
 10880  10881  10882 -711 -10884 0
 10880  10881  10882 -711  10885 0

c  1+1 --> 2
c    (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0 ∧  p_711) -> (-b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0)
c  in CNF:
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_2
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨  b^{9, 80}_1
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ -p_711 ∨ -b^{9, 80}_0
c  in DIMACS:
 10880  10881 -10882 -711 -10883 0
 10880  10881 -10882 -711  10884 0
 10880  10881 -10882 -711 -10885 0

c  2+1 --> break 
c    (-b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧  p_711) -> break
c  in CNF:
c     b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ -p_711 ∨ break
c  in DIMACS:
 10880 -10881  10882 -711 1162 0


c  2-1 --> 1
c    (-b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧ -p_711) -> (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0)
c  in CNF:
c     b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_2
c     b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_1
c     b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨  b^{9, 80}_0
c  in DIMACS:
 10880 -10881  10882  711 -10883 0
 10880 -10881  10882  711 -10884 0
 10880 -10881  10882  711  10885 0

c  1-1 --> 0
c    (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0 ∧ -p_711) -> (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧ -b^{9, 80}_0)
c  in CNF:
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_2
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_1
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_0
c  in DIMACS:
 10880  10881 -10882  711 -10883 0
 10880  10881 -10882  711 -10884 0
 10880  10881 -10882  711 -10885 0

c  0-1 --> -1
c    (-b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧ -p_711) -> ( b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0)
c  in CNF:
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨  b^{9, 80}_2
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_1
c     b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨  b^{9, 80}_0
c  in DIMACS:
 10880  10881  10882  711  10883 0
 10880  10881  10882  711 -10884 0
 10880  10881  10882  711  10885 0

c  -1-1 --> -2
c    ( b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧  b^{9, 79}_0 ∧ -p_711) -> ( b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0)
c  in CNF:
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨  b^{9, 80}_2
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨  b^{9, 80}_1
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨  p_711 ∨ -b^{9, 80}_0
c  in DIMACS:
-10880  10881 -10882  711  10883 0
-10880  10881 -10882  711  10884 0
-10880  10881 -10882  711 -10885 0

c  -2-1 --> break 
c    ( b^{9, 79}_2 ∧  b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧ -p_711) -> break
c  in CNF:
c    -b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨  b^{9, 79}_0 ∨  p_711 ∨ break
c  in DIMACS:
-10880 -10881  10882  711 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 79}_2 ∧ -b^{9, 79}_1 ∧ -b^{9, 79}_0 ∧ true) 
c  in CNF:
c    -b^{9, 79}_2 ∨  b^{9, 79}_1 ∨  b^{9, 79}_0 ∨ false 
c  in DIMACS:
-10880  10881  10882  0

c  3 does not represent an automaton state.
c    -(-b^{9, 79}_2 ∧  b^{9, 79}_1 ∧  b^{9, 79}_0 ∧ true) 
c  in CNF:
c     b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ false 
c  in DIMACS:
 10880 -10881 -10882  0
c  -3 does not represent an automaton state.
c    -( b^{9, 79}_2 ∧  b^{9, 79}_1 ∧  b^{9, 79}_0 ∧ true) 
c  in CNF:
c    -b^{9, 79}_2 ∨ -b^{9, 79}_1 ∨ -b^{9, 79}_0 ∨ false 
c  in DIMACS:
-10880 -10881 -10882  0

c i = 80
c  -2+1 --> -1
c    ( b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧  p_720) -> ( b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0)
c  in CNF:
c    -b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨  b^{9, 81}_2
c    -b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_1
c    -b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨  b^{9, 81}_0
c  in DIMACS:
-10883 -10884  10885 -720  10886 0
-10883 -10884  10885 -720 -10887 0
-10883 -10884  10885 -720  10888 0

c  -1+1 --> 0
c    ( b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0 ∧  p_720) -> (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧ -b^{9, 81}_0)
c  in CNF:
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_2
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_1
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_0
c  in DIMACS:
-10883  10884 -10885 -720 -10886 0
-10883  10884 -10885 -720 -10887 0
-10883  10884 -10885 -720 -10888 0

c  0+1 --> 1
c    (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧  p_720) -> (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0)
c  in CNF:
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_2
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_1
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨  b^{9, 81}_0
c  in DIMACS:
 10883  10884  10885 -720 -10886 0
 10883  10884  10885 -720 -10887 0
 10883  10884  10885 -720  10888 0

c  1+1 --> 2
c    (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0 ∧  p_720) -> (-b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0)
c  in CNF:
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_2
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨  b^{9, 81}_1
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ -p_720 ∨ -b^{9, 81}_0
c  in DIMACS:
 10883  10884 -10885 -720 -10886 0
 10883  10884 -10885 -720  10887 0
 10883  10884 -10885 -720 -10888 0

c  2+1 --> break 
c    (-b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧  p_720) -> break
c  in CNF:
c     b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 10883 -10884  10885 -720 1162 0


c  2-1 --> 1
c    (-b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧ -p_720) -> (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0)
c  in CNF:
c     b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_2
c     b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_1
c     b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨  b^{9, 81}_0
c  in DIMACS:
 10883 -10884  10885  720 -10886 0
 10883 -10884  10885  720 -10887 0
 10883 -10884  10885  720  10888 0

c  1-1 --> 0
c    (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0 ∧ -p_720) -> (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧ -b^{9, 81}_0)
c  in CNF:
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_2
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_1
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_0
c  in DIMACS:
 10883  10884 -10885  720 -10886 0
 10883  10884 -10885  720 -10887 0
 10883  10884 -10885  720 -10888 0

c  0-1 --> -1
c    (-b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧ -p_720) -> ( b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0)
c  in CNF:
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨  b^{9, 81}_2
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_1
c     b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨  b^{9, 81}_0
c  in DIMACS:
 10883  10884  10885  720  10886 0
 10883  10884  10885  720 -10887 0
 10883  10884  10885  720  10888 0

c  -1-1 --> -2
c    ( b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧  b^{9, 80}_0 ∧ -p_720) -> ( b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0)
c  in CNF:
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨  b^{9, 81}_2
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨  b^{9, 81}_1
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨  p_720 ∨ -b^{9, 81}_0
c  in DIMACS:
-10883  10884 -10885  720  10886 0
-10883  10884 -10885  720  10887 0
-10883  10884 -10885  720 -10888 0

c  -2-1 --> break 
c    ( b^{9, 80}_2 ∧  b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨  b^{9, 80}_0 ∨  p_720 ∨ break
c  in DIMACS:
-10883 -10884  10885  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 80}_2 ∧ -b^{9, 80}_1 ∧ -b^{9, 80}_0 ∧ true) 
c  in CNF:
c    -b^{9, 80}_2 ∨  b^{9, 80}_1 ∨  b^{9, 80}_0 ∨ false 
c  in DIMACS:
-10883  10884  10885  0

c  3 does not represent an automaton state.
c    -(-b^{9, 80}_2 ∧  b^{9, 80}_1 ∧  b^{9, 80}_0 ∧ true) 
c  in CNF:
c     b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ false 
c  in DIMACS:
 10883 -10884 -10885  0
c  -3 does not represent an automaton state.
c    -( b^{9, 80}_2 ∧  b^{9, 80}_1 ∧  b^{9, 80}_0 ∧ true) 
c  in CNF:
c    -b^{9, 80}_2 ∨ -b^{9, 80}_1 ∨ -b^{9, 80}_0 ∨ false 
c  in DIMACS:
-10883 -10884 -10885  0

c i = 81
c  -2+1 --> -1
c    ( b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧  p_729) -> ( b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0)
c  in CNF:
c    -b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨  b^{9, 82}_2
c    -b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_1
c    -b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨  b^{9, 82}_0
c  in DIMACS:
-10886 -10887  10888 -729  10889 0
-10886 -10887  10888 -729 -10890 0
-10886 -10887  10888 -729  10891 0

c  -1+1 --> 0
c    ( b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0 ∧  p_729) -> (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧ -b^{9, 82}_0)
c  in CNF:
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_2
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_1
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_0
c  in DIMACS:
-10886  10887 -10888 -729 -10889 0
-10886  10887 -10888 -729 -10890 0
-10886  10887 -10888 -729 -10891 0

c  0+1 --> 1
c    (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧  p_729) -> (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0)
c  in CNF:
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_2
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_1
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨  b^{9, 82}_0
c  in DIMACS:
 10886  10887  10888 -729 -10889 0
 10886  10887  10888 -729 -10890 0
 10886  10887  10888 -729  10891 0

c  1+1 --> 2
c    (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0 ∧  p_729) -> (-b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0)
c  in CNF:
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_2
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨  b^{9, 82}_1
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ -p_729 ∨ -b^{9, 82}_0
c  in DIMACS:
 10886  10887 -10888 -729 -10889 0
 10886  10887 -10888 -729  10890 0
 10886  10887 -10888 -729 -10891 0

c  2+1 --> break 
c    (-b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧  p_729) -> break
c  in CNF:
c     b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 10886 -10887  10888 -729 1162 0


c  2-1 --> 1
c    (-b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧ -p_729) -> (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0)
c  in CNF:
c     b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_2
c     b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_1
c     b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨  b^{9, 82}_0
c  in DIMACS:
 10886 -10887  10888  729 -10889 0
 10886 -10887  10888  729 -10890 0
 10886 -10887  10888  729  10891 0

c  1-1 --> 0
c    (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0 ∧ -p_729) -> (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧ -b^{9, 82}_0)
c  in CNF:
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_2
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_1
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_0
c  in DIMACS:
 10886  10887 -10888  729 -10889 0
 10886  10887 -10888  729 -10890 0
 10886  10887 -10888  729 -10891 0

c  0-1 --> -1
c    (-b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧ -p_729) -> ( b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0)
c  in CNF:
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨  b^{9, 82}_2
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_1
c     b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨  b^{9, 82}_0
c  in DIMACS:
 10886  10887  10888  729  10889 0
 10886  10887  10888  729 -10890 0
 10886  10887  10888  729  10891 0

c  -1-1 --> -2
c    ( b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧  b^{9, 81}_0 ∧ -p_729) -> ( b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0)
c  in CNF:
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨  b^{9, 82}_2
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨  b^{9, 82}_1
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨  p_729 ∨ -b^{9, 82}_0
c  in DIMACS:
-10886  10887 -10888  729  10889 0
-10886  10887 -10888  729  10890 0
-10886  10887 -10888  729 -10891 0

c  -2-1 --> break 
c    ( b^{9, 81}_2 ∧  b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨  b^{9, 81}_0 ∨  p_729 ∨ break
c  in DIMACS:
-10886 -10887  10888  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 81}_2 ∧ -b^{9, 81}_1 ∧ -b^{9, 81}_0 ∧ true) 
c  in CNF:
c    -b^{9, 81}_2 ∨  b^{9, 81}_1 ∨  b^{9, 81}_0 ∨ false 
c  in DIMACS:
-10886  10887  10888  0

c  3 does not represent an automaton state.
c    -(-b^{9, 81}_2 ∧  b^{9, 81}_1 ∧  b^{9, 81}_0 ∧ true) 
c  in CNF:
c     b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ false 
c  in DIMACS:
 10886 -10887 -10888  0
c  -3 does not represent an automaton state.
c    -( b^{9, 81}_2 ∧  b^{9, 81}_1 ∧  b^{9, 81}_0 ∧ true) 
c  in CNF:
c    -b^{9, 81}_2 ∨ -b^{9, 81}_1 ∨ -b^{9, 81}_0 ∨ false 
c  in DIMACS:
-10886 -10887 -10888  0

c i = 82
c  -2+1 --> -1
c    ( b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧  p_738) -> ( b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0)
c  in CNF:
c    -b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨  b^{9, 83}_2
c    -b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_1
c    -b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨  b^{9, 83}_0
c  in DIMACS:
-10889 -10890  10891 -738  10892 0
-10889 -10890  10891 -738 -10893 0
-10889 -10890  10891 -738  10894 0

c  -1+1 --> 0
c    ( b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0 ∧  p_738) -> (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧ -b^{9, 83}_0)
c  in CNF:
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_2
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_1
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_0
c  in DIMACS:
-10889  10890 -10891 -738 -10892 0
-10889  10890 -10891 -738 -10893 0
-10889  10890 -10891 -738 -10894 0

c  0+1 --> 1
c    (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧  p_738) -> (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0)
c  in CNF:
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_2
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_1
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨  b^{9, 83}_0
c  in DIMACS:
 10889  10890  10891 -738 -10892 0
 10889  10890  10891 -738 -10893 0
 10889  10890  10891 -738  10894 0

c  1+1 --> 2
c    (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0 ∧  p_738) -> (-b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0)
c  in CNF:
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_2
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨  b^{9, 83}_1
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ -p_738 ∨ -b^{9, 83}_0
c  in DIMACS:
 10889  10890 -10891 -738 -10892 0
 10889  10890 -10891 -738  10893 0
 10889  10890 -10891 -738 -10894 0

c  2+1 --> break 
c    (-b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧  p_738) -> break
c  in CNF:
c     b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 10889 -10890  10891 -738 1162 0


c  2-1 --> 1
c    (-b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧ -p_738) -> (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0)
c  in CNF:
c     b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_2
c     b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_1
c     b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨  b^{9, 83}_0
c  in DIMACS:
 10889 -10890  10891  738 -10892 0
 10889 -10890  10891  738 -10893 0
 10889 -10890  10891  738  10894 0

c  1-1 --> 0
c    (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0 ∧ -p_738) -> (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧ -b^{9, 83}_0)
c  in CNF:
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_2
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_1
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_0
c  in DIMACS:
 10889  10890 -10891  738 -10892 0
 10889  10890 -10891  738 -10893 0
 10889  10890 -10891  738 -10894 0

c  0-1 --> -1
c    (-b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧ -p_738) -> ( b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0)
c  in CNF:
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨  b^{9, 83}_2
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_1
c     b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨  b^{9, 83}_0
c  in DIMACS:
 10889  10890  10891  738  10892 0
 10889  10890  10891  738 -10893 0
 10889  10890  10891  738  10894 0

c  -1-1 --> -2
c    ( b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧  b^{9, 82}_0 ∧ -p_738) -> ( b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0)
c  in CNF:
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨  b^{9, 83}_2
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨  b^{9, 83}_1
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨  p_738 ∨ -b^{9, 83}_0
c  in DIMACS:
-10889  10890 -10891  738  10892 0
-10889  10890 -10891  738  10893 0
-10889  10890 -10891  738 -10894 0

c  -2-1 --> break 
c    ( b^{9, 82}_2 ∧  b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨  b^{9, 82}_0 ∨  p_738 ∨ break
c  in DIMACS:
-10889 -10890  10891  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 82}_2 ∧ -b^{9, 82}_1 ∧ -b^{9, 82}_0 ∧ true) 
c  in CNF:
c    -b^{9, 82}_2 ∨  b^{9, 82}_1 ∨  b^{9, 82}_0 ∨ false 
c  in DIMACS:
-10889  10890  10891  0

c  3 does not represent an automaton state.
c    -(-b^{9, 82}_2 ∧  b^{9, 82}_1 ∧  b^{9, 82}_0 ∧ true) 
c  in CNF:
c     b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ false 
c  in DIMACS:
 10889 -10890 -10891  0
c  -3 does not represent an automaton state.
c    -( b^{9, 82}_2 ∧  b^{9, 82}_1 ∧  b^{9, 82}_0 ∧ true) 
c  in CNF:
c    -b^{9, 82}_2 ∨ -b^{9, 82}_1 ∨ -b^{9, 82}_0 ∨ false 
c  in DIMACS:
-10889 -10890 -10891  0

c i = 83
c  -2+1 --> -1
c    ( b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧  p_747) -> ( b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0)
c  in CNF:
c    -b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨  b^{9, 84}_2
c    -b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_1
c    -b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨  b^{9, 84}_0
c  in DIMACS:
-10892 -10893  10894 -747  10895 0
-10892 -10893  10894 -747 -10896 0
-10892 -10893  10894 -747  10897 0

c  -1+1 --> 0
c    ( b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0 ∧  p_747) -> (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧ -b^{9, 84}_0)
c  in CNF:
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_2
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_1
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_0
c  in DIMACS:
-10892  10893 -10894 -747 -10895 0
-10892  10893 -10894 -747 -10896 0
-10892  10893 -10894 -747 -10897 0

c  0+1 --> 1
c    (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧  p_747) -> (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0)
c  in CNF:
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_2
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_1
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨  b^{9, 84}_0
c  in DIMACS:
 10892  10893  10894 -747 -10895 0
 10892  10893  10894 -747 -10896 0
 10892  10893  10894 -747  10897 0

c  1+1 --> 2
c    (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0 ∧  p_747) -> (-b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0)
c  in CNF:
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_2
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨  b^{9, 84}_1
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ -p_747 ∨ -b^{9, 84}_0
c  in DIMACS:
 10892  10893 -10894 -747 -10895 0
 10892  10893 -10894 -747  10896 0
 10892  10893 -10894 -747 -10897 0

c  2+1 --> break 
c    (-b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧  p_747) -> break
c  in CNF:
c     b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ -p_747 ∨ break
c  in DIMACS:
 10892 -10893  10894 -747 1162 0


c  2-1 --> 1
c    (-b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧ -p_747) -> (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0)
c  in CNF:
c     b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_2
c     b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_1
c     b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨  b^{9, 84}_0
c  in DIMACS:
 10892 -10893  10894  747 -10895 0
 10892 -10893  10894  747 -10896 0
 10892 -10893  10894  747  10897 0

c  1-1 --> 0
c    (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0 ∧ -p_747) -> (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧ -b^{9, 84}_0)
c  in CNF:
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_2
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_1
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_0
c  in DIMACS:
 10892  10893 -10894  747 -10895 0
 10892  10893 -10894  747 -10896 0
 10892  10893 -10894  747 -10897 0

c  0-1 --> -1
c    (-b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧ -p_747) -> ( b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0)
c  in CNF:
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨  b^{9, 84}_2
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_1
c     b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨  b^{9, 84}_0
c  in DIMACS:
 10892  10893  10894  747  10895 0
 10892  10893  10894  747 -10896 0
 10892  10893  10894  747  10897 0

c  -1-1 --> -2
c    ( b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧  b^{9, 83}_0 ∧ -p_747) -> ( b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0)
c  in CNF:
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨  b^{9, 84}_2
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨  b^{9, 84}_1
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨  p_747 ∨ -b^{9, 84}_0
c  in DIMACS:
-10892  10893 -10894  747  10895 0
-10892  10893 -10894  747  10896 0
-10892  10893 -10894  747 -10897 0

c  -2-1 --> break 
c    ( b^{9, 83}_2 ∧  b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧ -p_747) -> break
c  in CNF:
c    -b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨  b^{9, 83}_0 ∨  p_747 ∨ break
c  in DIMACS:
-10892 -10893  10894  747 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 83}_2 ∧ -b^{9, 83}_1 ∧ -b^{9, 83}_0 ∧ true) 
c  in CNF:
c    -b^{9, 83}_2 ∨  b^{9, 83}_1 ∨  b^{9, 83}_0 ∨ false 
c  in DIMACS:
-10892  10893  10894  0

c  3 does not represent an automaton state.
c    -(-b^{9, 83}_2 ∧  b^{9, 83}_1 ∧  b^{9, 83}_0 ∧ true) 
c  in CNF:
c     b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ false 
c  in DIMACS:
 10892 -10893 -10894  0
c  -3 does not represent an automaton state.
c    -( b^{9, 83}_2 ∧  b^{9, 83}_1 ∧  b^{9, 83}_0 ∧ true) 
c  in CNF:
c    -b^{9, 83}_2 ∨ -b^{9, 83}_1 ∨ -b^{9, 83}_0 ∨ false 
c  in DIMACS:
-10892 -10893 -10894  0

c i = 84
c  -2+1 --> -1
c    ( b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧  p_756) -> ( b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0)
c  in CNF:
c    -b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨  b^{9, 85}_2
c    -b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_1
c    -b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨  b^{9, 85}_0
c  in DIMACS:
-10895 -10896  10897 -756  10898 0
-10895 -10896  10897 -756 -10899 0
-10895 -10896  10897 -756  10900 0

c  -1+1 --> 0
c    ( b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0 ∧  p_756) -> (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧ -b^{9, 85}_0)
c  in CNF:
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_2
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_1
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_0
c  in DIMACS:
-10895  10896 -10897 -756 -10898 0
-10895  10896 -10897 -756 -10899 0
-10895  10896 -10897 -756 -10900 0

c  0+1 --> 1
c    (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧  p_756) -> (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0)
c  in CNF:
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_2
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_1
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨  b^{9, 85}_0
c  in DIMACS:
 10895  10896  10897 -756 -10898 0
 10895  10896  10897 -756 -10899 0
 10895  10896  10897 -756  10900 0

c  1+1 --> 2
c    (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0 ∧  p_756) -> (-b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0)
c  in CNF:
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_2
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨  b^{9, 85}_1
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ -p_756 ∨ -b^{9, 85}_0
c  in DIMACS:
 10895  10896 -10897 -756 -10898 0
 10895  10896 -10897 -756  10899 0
 10895  10896 -10897 -756 -10900 0

c  2+1 --> break 
c    (-b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧  p_756) -> break
c  in CNF:
c     b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 10895 -10896  10897 -756 1162 0


c  2-1 --> 1
c    (-b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧ -p_756) -> (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0)
c  in CNF:
c     b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_2
c     b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_1
c     b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨  b^{9, 85}_0
c  in DIMACS:
 10895 -10896  10897  756 -10898 0
 10895 -10896  10897  756 -10899 0
 10895 -10896  10897  756  10900 0

c  1-1 --> 0
c    (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0 ∧ -p_756) -> (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧ -b^{9, 85}_0)
c  in CNF:
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_2
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_1
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_0
c  in DIMACS:
 10895  10896 -10897  756 -10898 0
 10895  10896 -10897  756 -10899 0
 10895  10896 -10897  756 -10900 0

c  0-1 --> -1
c    (-b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧ -p_756) -> ( b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0)
c  in CNF:
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨  b^{9, 85}_2
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_1
c     b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨  b^{9, 85}_0
c  in DIMACS:
 10895  10896  10897  756  10898 0
 10895  10896  10897  756 -10899 0
 10895  10896  10897  756  10900 0

c  -1-1 --> -2
c    ( b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧  b^{9, 84}_0 ∧ -p_756) -> ( b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0)
c  in CNF:
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨  b^{9, 85}_2
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨  b^{9, 85}_1
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨  p_756 ∨ -b^{9, 85}_0
c  in DIMACS:
-10895  10896 -10897  756  10898 0
-10895  10896 -10897  756  10899 0
-10895  10896 -10897  756 -10900 0

c  -2-1 --> break 
c    ( b^{9, 84}_2 ∧  b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨  b^{9, 84}_0 ∨  p_756 ∨ break
c  in DIMACS:
-10895 -10896  10897  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 84}_2 ∧ -b^{9, 84}_1 ∧ -b^{9, 84}_0 ∧ true) 
c  in CNF:
c    -b^{9, 84}_2 ∨  b^{9, 84}_1 ∨  b^{9, 84}_0 ∨ false 
c  in DIMACS:
-10895  10896  10897  0

c  3 does not represent an automaton state.
c    -(-b^{9, 84}_2 ∧  b^{9, 84}_1 ∧  b^{9, 84}_0 ∧ true) 
c  in CNF:
c     b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ false 
c  in DIMACS:
 10895 -10896 -10897  0
c  -3 does not represent an automaton state.
c    -( b^{9, 84}_2 ∧  b^{9, 84}_1 ∧  b^{9, 84}_0 ∧ true) 
c  in CNF:
c    -b^{9, 84}_2 ∨ -b^{9, 84}_1 ∨ -b^{9, 84}_0 ∨ false 
c  in DIMACS:
-10895 -10896 -10897  0

c i = 85
c  -2+1 --> -1
c    ( b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧  p_765) -> ( b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0)
c  in CNF:
c    -b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨  b^{9, 86}_2
c    -b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_1
c    -b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨  b^{9, 86}_0
c  in DIMACS:
-10898 -10899  10900 -765  10901 0
-10898 -10899  10900 -765 -10902 0
-10898 -10899  10900 -765  10903 0

c  -1+1 --> 0
c    ( b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0 ∧  p_765) -> (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧ -b^{9, 86}_0)
c  in CNF:
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_2
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_1
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_0
c  in DIMACS:
-10898  10899 -10900 -765 -10901 0
-10898  10899 -10900 -765 -10902 0
-10898  10899 -10900 -765 -10903 0

c  0+1 --> 1
c    (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧  p_765) -> (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0)
c  in CNF:
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_2
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_1
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨  b^{9, 86}_0
c  in DIMACS:
 10898  10899  10900 -765 -10901 0
 10898  10899  10900 -765 -10902 0
 10898  10899  10900 -765  10903 0

c  1+1 --> 2
c    (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0 ∧  p_765) -> (-b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0)
c  in CNF:
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_2
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨  b^{9, 86}_1
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ -p_765 ∨ -b^{9, 86}_0
c  in DIMACS:
 10898  10899 -10900 -765 -10901 0
 10898  10899 -10900 -765  10902 0
 10898  10899 -10900 -765 -10903 0

c  2+1 --> break 
c    (-b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧  p_765) -> break
c  in CNF:
c     b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 10898 -10899  10900 -765 1162 0


c  2-1 --> 1
c    (-b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧ -p_765) -> (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0)
c  in CNF:
c     b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_2
c     b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_1
c     b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨  b^{9, 86}_0
c  in DIMACS:
 10898 -10899  10900  765 -10901 0
 10898 -10899  10900  765 -10902 0
 10898 -10899  10900  765  10903 0

c  1-1 --> 0
c    (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0 ∧ -p_765) -> (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧ -b^{9, 86}_0)
c  in CNF:
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_2
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_1
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_0
c  in DIMACS:
 10898  10899 -10900  765 -10901 0
 10898  10899 -10900  765 -10902 0
 10898  10899 -10900  765 -10903 0

c  0-1 --> -1
c    (-b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧ -p_765) -> ( b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0)
c  in CNF:
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨  b^{9, 86}_2
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_1
c     b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨  b^{9, 86}_0
c  in DIMACS:
 10898  10899  10900  765  10901 0
 10898  10899  10900  765 -10902 0
 10898  10899  10900  765  10903 0

c  -1-1 --> -2
c    ( b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧  b^{9, 85}_0 ∧ -p_765) -> ( b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0)
c  in CNF:
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨  b^{9, 86}_2
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨  b^{9, 86}_1
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨  p_765 ∨ -b^{9, 86}_0
c  in DIMACS:
-10898  10899 -10900  765  10901 0
-10898  10899 -10900  765  10902 0
-10898  10899 -10900  765 -10903 0

c  -2-1 --> break 
c    ( b^{9, 85}_2 ∧  b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨  b^{9, 85}_0 ∨  p_765 ∨ break
c  in DIMACS:
-10898 -10899  10900  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 85}_2 ∧ -b^{9, 85}_1 ∧ -b^{9, 85}_0 ∧ true) 
c  in CNF:
c    -b^{9, 85}_2 ∨  b^{9, 85}_1 ∨  b^{9, 85}_0 ∨ false 
c  in DIMACS:
-10898  10899  10900  0

c  3 does not represent an automaton state.
c    -(-b^{9, 85}_2 ∧  b^{9, 85}_1 ∧  b^{9, 85}_0 ∧ true) 
c  in CNF:
c     b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ false 
c  in DIMACS:
 10898 -10899 -10900  0
c  -3 does not represent an automaton state.
c    -( b^{9, 85}_2 ∧  b^{9, 85}_1 ∧  b^{9, 85}_0 ∧ true) 
c  in CNF:
c    -b^{9, 85}_2 ∨ -b^{9, 85}_1 ∨ -b^{9, 85}_0 ∨ false 
c  in DIMACS:
-10898 -10899 -10900  0

c i = 86
c  -2+1 --> -1
c    ( b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧  p_774) -> ( b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0)
c  in CNF:
c    -b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨  b^{9, 87}_2
c    -b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_1
c    -b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨  b^{9, 87}_0
c  in DIMACS:
-10901 -10902  10903 -774  10904 0
-10901 -10902  10903 -774 -10905 0
-10901 -10902  10903 -774  10906 0

c  -1+1 --> 0
c    ( b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0 ∧  p_774) -> (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧ -b^{9, 87}_0)
c  in CNF:
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_2
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_1
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_0
c  in DIMACS:
-10901  10902 -10903 -774 -10904 0
-10901  10902 -10903 -774 -10905 0
-10901  10902 -10903 -774 -10906 0

c  0+1 --> 1
c    (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧  p_774) -> (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0)
c  in CNF:
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_2
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_1
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨  b^{9, 87}_0
c  in DIMACS:
 10901  10902  10903 -774 -10904 0
 10901  10902  10903 -774 -10905 0
 10901  10902  10903 -774  10906 0

c  1+1 --> 2
c    (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0 ∧  p_774) -> (-b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0)
c  in CNF:
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_2
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨  b^{9, 87}_1
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ -p_774 ∨ -b^{9, 87}_0
c  in DIMACS:
 10901  10902 -10903 -774 -10904 0
 10901  10902 -10903 -774  10905 0
 10901  10902 -10903 -774 -10906 0

c  2+1 --> break 
c    (-b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧  p_774) -> break
c  in CNF:
c     b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 10901 -10902  10903 -774 1162 0


c  2-1 --> 1
c    (-b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧ -p_774) -> (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0)
c  in CNF:
c     b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_2
c     b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_1
c     b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨  b^{9, 87}_0
c  in DIMACS:
 10901 -10902  10903  774 -10904 0
 10901 -10902  10903  774 -10905 0
 10901 -10902  10903  774  10906 0

c  1-1 --> 0
c    (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0 ∧ -p_774) -> (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧ -b^{9, 87}_0)
c  in CNF:
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_2
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_1
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_0
c  in DIMACS:
 10901  10902 -10903  774 -10904 0
 10901  10902 -10903  774 -10905 0
 10901  10902 -10903  774 -10906 0

c  0-1 --> -1
c    (-b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧ -p_774) -> ( b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0)
c  in CNF:
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨  b^{9, 87}_2
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_1
c     b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨  b^{9, 87}_0
c  in DIMACS:
 10901  10902  10903  774  10904 0
 10901  10902  10903  774 -10905 0
 10901  10902  10903  774  10906 0

c  -1-1 --> -2
c    ( b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧  b^{9, 86}_0 ∧ -p_774) -> ( b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0)
c  in CNF:
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨  b^{9, 87}_2
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨  b^{9, 87}_1
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨  p_774 ∨ -b^{9, 87}_0
c  in DIMACS:
-10901  10902 -10903  774  10904 0
-10901  10902 -10903  774  10905 0
-10901  10902 -10903  774 -10906 0

c  -2-1 --> break 
c    ( b^{9, 86}_2 ∧  b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨  b^{9, 86}_0 ∨  p_774 ∨ break
c  in DIMACS:
-10901 -10902  10903  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 86}_2 ∧ -b^{9, 86}_1 ∧ -b^{9, 86}_0 ∧ true) 
c  in CNF:
c    -b^{9, 86}_2 ∨  b^{9, 86}_1 ∨  b^{9, 86}_0 ∨ false 
c  in DIMACS:
-10901  10902  10903  0

c  3 does not represent an automaton state.
c    -(-b^{9, 86}_2 ∧  b^{9, 86}_1 ∧  b^{9, 86}_0 ∧ true) 
c  in CNF:
c     b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ false 
c  in DIMACS:
 10901 -10902 -10903  0
c  -3 does not represent an automaton state.
c    -( b^{9, 86}_2 ∧  b^{9, 86}_1 ∧  b^{9, 86}_0 ∧ true) 
c  in CNF:
c    -b^{9, 86}_2 ∨ -b^{9, 86}_1 ∨ -b^{9, 86}_0 ∨ false 
c  in DIMACS:
-10901 -10902 -10903  0

c i = 87
c  -2+1 --> -1
c    ( b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧  p_783) -> ( b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0)
c  in CNF:
c    -b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨  b^{9, 88}_2
c    -b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_1
c    -b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨  b^{9, 88}_0
c  in DIMACS:
-10904 -10905  10906 -783  10907 0
-10904 -10905  10906 -783 -10908 0
-10904 -10905  10906 -783  10909 0

c  -1+1 --> 0
c    ( b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0 ∧  p_783) -> (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧ -b^{9, 88}_0)
c  in CNF:
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_2
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_1
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_0
c  in DIMACS:
-10904  10905 -10906 -783 -10907 0
-10904  10905 -10906 -783 -10908 0
-10904  10905 -10906 -783 -10909 0

c  0+1 --> 1
c    (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧  p_783) -> (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0)
c  in CNF:
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_2
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_1
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨  b^{9, 88}_0
c  in DIMACS:
 10904  10905  10906 -783 -10907 0
 10904  10905  10906 -783 -10908 0
 10904  10905  10906 -783  10909 0

c  1+1 --> 2
c    (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0 ∧  p_783) -> (-b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0)
c  in CNF:
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_2
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨  b^{9, 88}_1
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ -p_783 ∨ -b^{9, 88}_0
c  in DIMACS:
 10904  10905 -10906 -783 -10907 0
 10904  10905 -10906 -783  10908 0
 10904  10905 -10906 -783 -10909 0

c  2+1 --> break 
c    (-b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧  p_783) -> break
c  in CNF:
c     b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 10904 -10905  10906 -783 1162 0


c  2-1 --> 1
c    (-b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧ -p_783) -> (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0)
c  in CNF:
c     b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_2
c     b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_1
c     b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨  b^{9, 88}_0
c  in DIMACS:
 10904 -10905  10906  783 -10907 0
 10904 -10905  10906  783 -10908 0
 10904 -10905  10906  783  10909 0

c  1-1 --> 0
c    (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0 ∧ -p_783) -> (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧ -b^{9, 88}_0)
c  in CNF:
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_2
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_1
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_0
c  in DIMACS:
 10904  10905 -10906  783 -10907 0
 10904  10905 -10906  783 -10908 0
 10904  10905 -10906  783 -10909 0

c  0-1 --> -1
c    (-b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧ -p_783) -> ( b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0)
c  in CNF:
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨  b^{9, 88}_2
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_1
c     b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨  b^{9, 88}_0
c  in DIMACS:
 10904  10905  10906  783  10907 0
 10904  10905  10906  783 -10908 0
 10904  10905  10906  783  10909 0

c  -1-1 --> -2
c    ( b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧  b^{9, 87}_0 ∧ -p_783) -> ( b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0)
c  in CNF:
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨  b^{9, 88}_2
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨  b^{9, 88}_1
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨  p_783 ∨ -b^{9, 88}_0
c  in DIMACS:
-10904  10905 -10906  783  10907 0
-10904  10905 -10906  783  10908 0
-10904  10905 -10906  783 -10909 0

c  -2-1 --> break 
c    ( b^{9, 87}_2 ∧  b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨  b^{9, 87}_0 ∨  p_783 ∨ break
c  in DIMACS:
-10904 -10905  10906  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 87}_2 ∧ -b^{9, 87}_1 ∧ -b^{9, 87}_0 ∧ true) 
c  in CNF:
c    -b^{9, 87}_2 ∨  b^{9, 87}_1 ∨  b^{9, 87}_0 ∨ false 
c  in DIMACS:
-10904  10905  10906  0

c  3 does not represent an automaton state.
c    -(-b^{9, 87}_2 ∧  b^{9, 87}_1 ∧  b^{9, 87}_0 ∧ true) 
c  in CNF:
c     b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ false 
c  in DIMACS:
 10904 -10905 -10906  0
c  -3 does not represent an automaton state.
c    -( b^{9, 87}_2 ∧  b^{9, 87}_1 ∧  b^{9, 87}_0 ∧ true) 
c  in CNF:
c    -b^{9, 87}_2 ∨ -b^{9, 87}_1 ∨ -b^{9, 87}_0 ∨ false 
c  in DIMACS:
-10904 -10905 -10906  0

c i = 88
c  -2+1 --> -1
c    ( b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧  p_792) -> ( b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0)
c  in CNF:
c    -b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨  b^{9, 89}_2
c    -b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_1
c    -b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨  b^{9, 89}_0
c  in DIMACS:
-10907 -10908  10909 -792  10910 0
-10907 -10908  10909 -792 -10911 0
-10907 -10908  10909 -792  10912 0

c  -1+1 --> 0
c    ( b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0 ∧  p_792) -> (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧ -b^{9, 89}_0)
c  in CNF:
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_2
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_1
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_0
c  in DIMACS:
-10907  10908 -10909 -792 -10910 0
-10907  10908 -10909 -792 -10911 0
-10907  10908 -10909 -792 -10912 0

c  0+1 --> 1
c    (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧  p_792) -> (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0)
c  in CNF:
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_2
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_1
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨  b^{9, 89}_0
c  in DIMACS:
 10907  10908  10909 -792 -10910 0
 10907  10908  10909 -792 -10911 0
 10907  10908  10909 -792  10912 0

c  1+1 --> 2
c    (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0 ∧  p_792) -> (-b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0)
c  in CNF:
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_2
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨  b^{9, 89}_1
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ -p_792 ∨ -b^{9, 89}_0
c  in DIMACS:
 10907  10908 -10909 -792 -10910 0
 10907  10908 -10909 -792  10911 0
 10907  10908 -10909 -792 -10912 0

c  2+1 --> break 
c    (-b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧  p_792) -> break
c  in CNF:
c     b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 10907 -10908  10909 -792 1162 0


c  2-1 --> 1
c    (-b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧ -p_792) -> (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0)
c  in CNF:
c     b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_2
c     b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_1
c     b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨  b^{9, 89}_0
c  in DIMACS:
 10907 -10908  10909  792 -10910 0
 10907 -10908  10909  792 -10911 0
 10907 -10908  10909  792  10912 0

c  1-1 --> 0
c    (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0 ∧ -p_792) -> (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧ -b^{9, 89}_0)
c  in CNF:
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_2
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_1
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_0
c  in DIMACS:
 10907  10908 -10909  792 -10910 0
 10907  10908 -10909  792 -10911 0
 10907  10908 -10909  792 -10912 0

c  0-1 --> -1
c    (-b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧ -p_792) -> ( b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0)
c  in CNF:
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨  b^{9, 89}_2
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_1
c     b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨  b^{9, 89}_0
c  in DIMACS:
 10907  10908  10909  792  10910 0
 10907  10908  10909  792 -10911 0
 10907  10908  10909  792  10912 0

c  -1-1 --> -2
c    ( b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧  b^{9, 88}_0 ∧ -p_792) -> ( b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0)
c  in CNF:
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨  b^{9, 89}_2
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨  b^{9, 89}_1
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨  p_792 ∨ -b^{9, 89}_0
c  in DIMACS:
-10907  10908 -10909  792  10910 0
-10907  10908 -10909  792  10911 0
-10907  10908 -10909  792 -10912 0

c  -2-1 --> break 
c    ( b^{9, 88}_2 ∧  b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨  b^{9, 88}_0 ∨  p_792 ∨ break
c  in DIMACS:
-10907 -10908  10909  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 88}_2 ∧ -b^{9, 88}_1 ∧ -b^{9, 88}_0 ∧ true) 
c  in CNF:
c    -b^{9, 88}_2 ∨  b^{9, 88}_1 ∨  b^{9, 88}_0 ∨ false 
c  in DIMACS:
-10907  10908  10909  0

c  3 does not represent an automaton state.
c    -(-b^{9, 88}_2 ∧  b^{9, 88}_1 ∧  b^{9, 88}_0 ∧ true) 
c  in CNF:
c     b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ false 
c  in DIMACS:
 10907 -10908 -10909  0
c  -3 does not represent an automaton state.
c    -( b^{9, 88}_2 ∧  b^{9, 88}_1 ∧  b^{9, 88}_0 ∧ true) 
c  in CNF:
c    -b^{9, 88}_2 ∨ -b^{9, 88}_1 ∨ -b^{9, 88}_0 ∨ false 
c  in DIMACS:
-10907 -10908 -10909  0

c i = 89
c  -2+1 --> -1
c    ( b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧  p_801) -> ( b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0)
c  in CNF:
c    -b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨  b^{9, 90}_2
c    -b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_1
c    -b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨  b^{9, 90}_0
c  in DIMACS:
-10910 -10911  10912 -801  10913 0
-10910 -10911  10912 -801 -10914 0
-10910 -10911  10912 -801  10915 0

c  -1+1 --> 0
c    ( b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0 ∧  p_801) -> (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧ -b^{9, 90}_0)
c  in CNF:
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_2
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_1
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_0
c  in DIMACS:
-10910  10911 -10912 -801 -10913 0
-10910  10911 -10912 -801 -10914 0
-10910  10911 -10912 -801 -10915 0

c  0+1 --> 1
c    (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧  p_801) -> (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0)
c  in CNF:
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_2
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_1
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨  b^{9, 90}_0
c  in DIMACS:
 10910  10911  10912 -801 -10913 0
 10910  10911  10912 -801 -10914 0
 10910  10911  10912 -801  10915 0

c  1+1 --> 2
c    (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0 ∧  p_801) -> (-b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0)
c  in CNF:
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_2
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨  b^{9, 90}_1
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ -p_801 ∨ -b^{9, 90}_0
c  in DIMACS:
 10910  10911 -10912 -801 -10913 0
 10910  10911 -10912 -801  10914 0
 10910  10911 -10912 -801 -10915 0

c  2+1 --> break 
c    (-b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧  p_801) -> break
c  in CNF:
c     b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ -p_801 ∨ break
c  in DIMACS:
 10910 -10911  10912 -801 1162 0


c  2-1 --> 1
c    (-b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧ -p_801) -> (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0)
c  in CNF:
c     b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_2
c     b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_1
c     b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨  b^{9, 90}_0
c  in DIMACS:
 10910 -10911  10912  801 -10913 0
 10910 -10911  10912  801 -10914 0
 10910 -10911  10912  801  10915 0

c  1-1 --> 0
c    (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0 ∧ -p_801) -> (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧ -b^{9, 90}_0)
c  in CNF:
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_2
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_1
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_0
c  in DIMACS:
 10910  10911 -10912  801 -10913 0
 10910  10911 -10912  801 -10914 0
 10910  10911 -10912  801 -10915 0

c  0-1 --> -1
c    (-b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧ -p_801) -> ( b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0)
c  in CNF:
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨  b^{9, 90}_2
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_1
c     b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨  b^{9, 90}_0
c  in DIMACS:
 10910  10911  10912  801  10913 0
 10910  10911  10912  801 -10914 0
 10910  10911  10912  801  10915 0

c  -1-1 --> -2
c    ( b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧  b^{9, 89}_0 ∧ -p_801) -> ( b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0)
c  in CNF:
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨  b^{9, 90}_2
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨  b^{9, 90}_1
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨  p_801 ∨ -b^{9, 90}_0
c  in DIMACS:
-10910  10911 -10912  801  10913 0
-10910  10911 -10912  801  10914 0
-10910  10911 -10912  801 -10915 0

c  -2-1 --> break 
c    ( b^{9, 89}_2 ∧  b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧ -p_801) -> break
c  in CNF:
c    -b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨  b^{9, 89}_0 ∨  p_801 ∨ break
c  in DIMACS:
-10910 -10911  10912  801 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 89}_2 ∧ -b^{9, 89}_1 ∧ -b^{9, 89}_0 ∧ true) 
c  in CNF:
c    -b^{9, 89}_2 ∨  b^{9, 89}_1 ∨  b^{9, 89}_0 ∨ false 
c  in DIMACS:
-10910  10911  10912  0

c  3 does not represent an automaton state.
c    -(-b^{9, 89}_2 ∧  b^{9, 89}_1 ∧  b^{9, 89}_0 ∧ true) 
c  in CNF:
c     b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ false 
c  in DIMACS:
 10910 -10911 -10912  0
c  -3 does not represent an automaton state.
c    -( b^{9, 89}_2 ∧  b^{9, 89}_1 ∧  b^{9, 89}_0 ∧ true) 
c  in CNF:
c    -b^{9, 89}_2 ∨ -b^{9, 89}_1 ∨ -b^{9, 89}_0 ∨ false 
c  in DIMACS:
-10910 -10911 -10912  0

c i = 90
c  -2+1 --> -1
c    ( b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧  p_810) -> ( b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0)
c  in CNF:
c    -b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨  b^{9, 91}_2
c    -b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_1
c    -b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨  b^{9, 91}_0
c  in DIMACS:
-10913 -10914  10915 -810  10916 0
-10913 -10914  10915 -810 -10917 0
-10913 -10914  10915 -810  10918 0

c  -1+1 --> 0
c    ( b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0 ∧  p_810) -> (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧ -b^{9, 91}_0)
c  in CNF:
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_2
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_1
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_0
c  in DIMACS:
-10913  10914 -10915 -810 -10916 0
-10913  10914 -10915 -810 -10917 0
-10913  10914 -10915 -810 -10918 0

c  0+1 --> 1
c    (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧  p_810) -> (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0)
c  in CNF:
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_2
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_1
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨  b^{9, 91}_0
c  in DIMACS:
 10913  10914  10915 -810 -10916 0
 10913  10914  10915 -810 -10917 0
 10913  10914  10915 -810  10918 0

c  1+1 --> 2
c    (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0 ∧  p_810) -> (-b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0)
c  in CNF:
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_2
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨  b^{9, 91}_1
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ -p_810 ∨ -b^{9, 91}_0
c  in DIMACS:
 10913  10914 -10915 -810 -10916 0
 10913  10914 -10915 -810  10917 0
 10913  10914 -10915 -810 -10918 0

c  2+1 --> break 
c    (-b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧  p_810) -> break
c  in CNF:
c     b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 10913 -10914  10915 -810 1162 0


c  2-1 --> 1
c    (-b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧ -p_810) -> (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0)
c  in CNF:
c     b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_2
c     b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_1
c     b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨  b^{9, 91}_0
c  in DIMACS:
 10913 -10914  10915  810 -10916 0
 10913 -10914  10915  810 -10917 0
 10913 -10914  10915  810  10918 0

c  1-1 --> 0
c    (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0 ∧ -p_810) -> (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧ -b^{9, 91}_0)
c  in CNF:
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_2
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_1
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_0
c  in DIMACS:
 10913  10914 -10915  810 -10916 0
 10913  10914 -10915  810 -10917 0
 10913  10914 -10915  810 -10918 0

c  0-1 --> -1
c    (-b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧ -p_810) -> ( b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0)
c  in CNF:
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨  b^{9, 91}_2
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_1
c     b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨  b^{9, 91}_0
c  in DIMACS:
 10913  10914  10915  810  10916 0
 10913  10914  10915  810 -10917 0
 10913  10914  10915  810  10918 0

c  -1-1 --> -2
c    ( b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧  b^{9, 90}_0 ∧ -p_810) -> ( b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0)
c  in CNF:
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨  b^{9, 91}_2
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨  b^{9, 91}_1
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨  p_810 ∨ -b^{9, 91}_0
c  in DIMACS:
-10913  10914 -10915  810  10916 0
-10913  10914 -10915  810  10917 0
-10913  10914 -10915  810 -10918 0

c  -2-1 --> break 
c    ( b^{9, 90}_2 ∧  b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨  b^{9, 90}_0 ∨  p_810 ∨ break
c  in DIMACS:
-10913 -10914  10915  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 90}_2 ∧ -b^{9, 90}_1 ∧ -b^{9, 90}_0 ∧ true) 
c  in CNF:
c    -b^{9, 90}_2 ∨  b^{9, 90}_1 ∨  b^{9, 90}_0 ∨ false 
c  in DIMACS:
-10913  10914  10915  0

c  3 does not represent an automaton state.
c    -(-b^{9, 90}_2 ∧  b^{9, 90}_1 ∧  b^{9, 90}_0 ∧ true) 
c  in CNF:
c     b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ false 
c  in DIMACS:
 10913 -10914 -10915  0
c  -3 does not represent an automaton state.
c    -( b^{9, 90}_2 ∧  b^{9, 90}_1 ∧  b^{9, 90}_0 ∧ true) 
c  in CNF:
c    -b^{9, 90}_2 ∨ -b^{9, 90}_1 ∨ -b^{9, 90}_0 ∨ false 
c  in DIMACS:
-10913 -10914 -10915  0

c i = 91
c  -2+1 --> -1
c    ( b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧  p_819) -> ( b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0)
c  in CNF:
c    -b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨  b^{9, 92}_2
c    -b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_1
c    -b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨  b^{9, 92}_0
c  in DIMACS:
-10916 -10917  10918 -819  10919 0
-10916 -10917  10918 -819 -10920 0
-10916 -10917  10918 -819  10921 0

c  -1+1 --> 0
c    ( b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0 ∧  p_819) -> (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧ -b^{9, 92}_0)
c  in CNF:
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_2
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_1
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_0
c  in DIMACS:
-10916  10917 -10918 -819 -10919 0
-10916  10917 -10918 -819 -10920 0
-10916  10917 -10918 -819 -10921 0

c  0+1 --> 1
c    (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧  p_819) -> (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0)
c  in CNF:
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_2
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_1
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨  b^{9, 92}_0
c  in DIMACS:
 10916  10917  10918 -819 -10919 0
 10916  10917  10918 -819 -10920 0
 10916  10917  10918 -819  10921 0

c  1+1 --> 2
c    (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0 ∧  p_819) -> (-b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0)
c  in CNF:
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_2
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨  b^{9, 92}_1
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ -p_819 ∨ -b^{9, 92}_0
c  in DIMACS:
 10916  10917 -10918 -819 -10919 0
 10916  10917 -10918 -819  10920 0
 10916  10917 -10918 -819 -10921 0

c  2+1 --> break 
c    (-b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧  p_819) -> break
c  in CNF:
c     b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 10916 -10917  10918 -819 1162 0


c  2-1 --> 1
c    (-b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧ -p_819) -> (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0)
c  in CNF:
c     b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_2
c     b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_1
c     b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨  b^{9, 92}_0
c  in DIMACS:
 10916 -10917  10918  819 -10919 0
 10916 -10917  10918  819 -10920 0
 10916 -10917  10918  819  10921 0

c  1-1 --> 0
c    (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0 ∧ -p_819) -> (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧ -b^{9, 92}_0)
c  in CNF:
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_2
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_1
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_0
c  in DIMACS:
 10916  10917 -10918  819 -10919 0
 10916  10917 -10918  819 -10920 0
 10916  10917 -10918  819 -10921 0

c  0-1 --> -1
c    (-b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧ -p_819) -> ( b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0)
c  in CNF:
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨  b^{9, 92}_2
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_1
c     b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨  b^{9, 92}_0
c  in DIMACS:
 10916  10917  10918  819  10919 0
 10916  10917  10918  819 -10920 0
 10916  10917  10918  819  10921 0

c  -1-1 --> -2
c    ( b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧  b^{9, 91}_0 ∧ -p_819) -> ( b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0)
c  in CNF:
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨  b^{9, 92}_2
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨  b^{9, 92}_1
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨  p_819 ∨ -b^{9, 92}_0
c  in DIMACS:
-10916  10917 -10918  819  10919 0
-10916  10917 -10918  819  10920 0
-10916  10917 -10918  819 -10921 0

c  -2-1 --> break 
c    ( b^{9, 91}_2 ∧  b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨  b^{9, 91}_0 ∨  p_819 ∨ break
c  in DIMACS:
-10916 -10917  10918  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 91}_2 ∧ -b^{9, 91}_1 ∧ -b^{9, 91}_0 ∧ true) 
c  in CNF:
c    -b^{9, 91}_2 ∨  b^{9, 91}_1 ∨  b^{9, 91}_0 ∨ false 
c  in DIMACS:
-10916  10917  10918  0

c  3 does not represent an automaton state.
c    -(-b^{9, 91}_2 ∧  b^{9, 91}_1 ∧  b^{9, 91}_0 ∧ true) 
c  in CNF:
c     b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ false 
c  in DIMACS:
 10916 -10917 -10918  0
c  -3 does not represent an automaton state.
c    -( b^{9, 91}_2 ∧  b^{9, 91}_1 ∧  b^{9, 91}_0 ∧ true) 
c  in CNF:
c    -b^{9, 91}_2 ∨ -b^{9, 91}_1 ∨ -b^{9, 91}_0 ∨ false 
c  in DIMACS:
-10916 -10917 -10918  0

c i = 92
c  -2+1 --> -1
c    ( b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧  p_828) -> ( b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0)
c  in CNF:
c    -b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨  b^{9, 93}_2
c    -b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_1
c    -b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨  b^{9, 93}_0
c  in DIMACS:
-10919 -10920  10921 -828  10922 0
-10919 -10920  10921 -828 -10923 0
-10919 -10920  10921 -828  10924 0

c  -1+1 --> 0
c    ( b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0 ∧  p_828) -> (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧ -b^{9, 93}_0)
c  in CNF:
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_2
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_1
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_0
c  in DIMACS:
-10919  10920 -10921 -828 -10922 0
-10919  10920 -10921 -828 -10923 0
-10919  10920 -10921 -828 -10924 0

c  0+1 --> 1
c    (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧  p_828) -> (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0)
c  in CNF:
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_2
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_1
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨  b^{9, 93}_0
c  in DIMACS:
 10919  10920  10921 -828 -10922 0
 10919  10920  10921 -828 -10923 0
 10919  10920  10921 -828  10924 0

c  1+1 --> 2
c    (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0 ∧  p_828) -> (-b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0)
c  in CNF:
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_2
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨  b^{9, 93}_1
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ -p_828 ∨ -b^{9, 93}_0
c  in DIMACS:
 10919  10920 -10921 -828 -10922 0
 10919  10920 -10921 -828  10923 0
 10919  10920 -10921 -828 -10924 0

c  2+1 --> break 
c    (-b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧  p_828) -> break
c  in CNF:
c     b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 10919 -10920  10921 -828 1162 0


c  2-1 --> 1
c    (-b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧ -p_828) -> (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0)
c  in CNF:
c     b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_2
c     b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_1
c     b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨  b^{9, 93}_0
c  in DIMACS:
 10919 -10920  10921  828 -10922 0
 10919 -10920  10921  828 -10923 0
 10919 -10920  10921  828  10924 0

c  1-1 --> 0
c    (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0 ∧ -p_828) -> (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧ -b^{9, 93}_0)
c  in CNF:
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_2
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_1
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_0
c  in DIMACS:
 10919  10920 -10921  828 -10922 0
 10919  10920 -10921  828 -10923 0
 10919  10920 -10921  828 -10924 0

c  0-1 --> -1
c    (-b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧ -p_828) -> ( b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0)
c  in CNF:
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨  b^{9, 93}_2
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_1
c     b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨  b^{9, 93}_0
c  in DIMACS:
 10919  10920  10921  828  10922 0
 10919  10920  10921  828 -10923 0
 10919  10920  10921  828  10924 0

c  -1-1 --> -2
c    ( b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧  b^{9, 92}_0 ∧ -p_828) -> ( b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0)
c  in CNF:
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨  b^{9, 93}_2
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨  b^{9, 93}_1
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨  p_828 ∨ -b^{9, 93}_0
c  in DIMACS:
-10919  10920 -10921  828  10922 0
-10919  10920 -10921  828  10923 0
-10919  10920 -10921  828 -10924 0

c  -2-1 --> break 
c    ( b^{9, 92}_2 ∧  b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨  b^{9, 92}_0 ∨  p_828 ∨ break
c  in DIMACS:
-10919 -10920  10921  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 92}_2 ∧ -b^{9, 92}_1 ∧ -b^{9, 92}_0 ∧ true) 
c  in CNF:
c    -b^{9, 92}_2 ∨  b^{9, 92}_1 ∨  b^{9, 92}_0 ∨ false 
c  in DIMACS:
-10919  10920  10921  0

c  3 does not represent an automaton state.
c    -(-b^{9, 92}_2 ∧  b^{9, 92}_1 ∧  b^{9, 92}_0 ∧ true) 
c  in CNF:
c     b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ false 
c  in DIMACS:
 10919 -10920 -10921  0
c  -3 does not represent an automaton state.
c    -( b^{9, 92}_2 ∧  b^{9, 92}_1 ∧  b^{9, 92}_0 ∧ true) 
c  in CNF:
c    -b^{9, 92}_2 ∨ -b^{9, 92}_1 ∨ -b^{9, 92}_0 ∨ false 
c  in DIMACS:
-10919 -10920 -10921  0

c i = 93
c  -2+1 --> -1
c    ( b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧  p_837) -> ( b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0)
c  in CNF:
c    -b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨  b^{9, 94}_2
c    -b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_1
c    -b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨  b^{9, 94}_0
c  in DIMACS:
-10922 -10923  10924 -837  10925 0
-10922 -10923  10924 -837 -10926 0
-10922 -10923  10924 -837  10927 0

c  -1+1 --> 0
c    ( b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0 ∧  p_837) -> (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧ -b^{9, 94}_0)
c  in CNF:
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_2
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_1
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_0
c  in DIMACS:
-10922  10923 -10924 -837 -10925 0
-10922  10923 -10924 -837 -10926 0
-10922  10923 -10924 -837 -10927 0

c  0+1 --> 1
c    (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧  p_837) -> (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0)
c  in CNF:
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_2
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_1
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨  b^{9, 94}_0
c  in DIMACS:
 10922  10923  10924 -837 -10925 0
 10922  10923  10924 -837 -10926 0
 10922  10923  10924 -837  10927 0

c  1+1 --> 2
c    (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0 ∧  p_837) -> (-b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0)
c  in CNF:
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_2
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨  b^{9, 94}_1
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ -p_837 ∨ -b^{9, 94}_0
c  in DIMACS:
 10922  10923 -10924 -837 -10925 0
 10922  10923 -10924 -837  10926 0
 10922  10923 -10924 -837 -10927 0

c  2+1 --> break 
c    (-b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧  p_837) -> break
c  in CNF:
c     b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 10922 -10923  10924 -837 1162 0


c  2-1 --> 1
c    (-b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧ -p_837) -> (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0)
c  in CNF:
c     b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_2
c     b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_1
c     b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨  b^{9, 94}_0
c  in DIMACS:
 10922 -10923  10924  837 -10925 0
 10922 -10923  10924  837 -10926 0
 10922 -10923  10924  837  10927 0

c  1-1 --> 0
c    (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0 ∧ -p_837) -> (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧ -b^{9, 94}_0)
c  in CNF:
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_2
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_1
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_0
c  in DIMACS:
 10922  10923 -10924  837 -10925 0
 10922  10923 -10924  837 -10926 0
 10922  10923 -10924  837 -10927 0

c  0-1 --> -1
c    (-b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧ -p_837) -> ( b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0)
c  in CNF:
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨  b^{9, 94}_2
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_1
c     b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨  b^{9, 94}_0
c  in DIMACS:
 10922  10923  10924  837  10925 0
 10922  10923  10924  837 -10926 0
 10922  10923  10924  837  10927 0

c  -1-1 --> -2
c    ( b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧  b^{9, 93}_0 ∧ -p_837) -> ( b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0)
c  in CNF:
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨  b^{9, 94}_2
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨  b^{9, 94}_1
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨  p_837 ∨ -b^{9, 94}_0
c  in DIMACS:
-10922  10923 -10924  837  10925 0
-10922  10923 -10924  837  10926 0
-10922  10923 -10924  837 -10927 0

c  -2-1 --> break 
c    ( b^{9, 93}_2 ∧  b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨  b^{9, 93}_0 ∨  p_837 ∨ break
c  in DIMACS:
-10922 -10923  10924  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 93}_2 ∧ -b^{9, 93}_1 ∧ -b^{9, 93}_0 ∧ true) 
c  in CNF:
c    -b^{9, 93}_2 ∨  b^{9, 93}_1 ∨  b^{9, 93}_0 ∨ false 
c  in DIMACS:
-10922  10923  10924  0

c  3 does not represent an automaton state.
c    -(-b^{9, 93}_2 ∧  b^{9, 93}_1 ∧  b^{9, 93}_0 ∧ true) 
c  in CNF:
c     b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ false 
c  in DIMACS:
 10922 -10923 -10924  0
c  -3 does not represent an automaton state.
c    -( b^{9, 93}_2 ∧  b^{9, 93}_1 ∧  b^{9, 93}_0 ∧ true) 
c  in CNF:
c    -b^{9, 93}_2 ∨ -b^{9, 93}_1 ∨ -b^{9, 93}_0 ∨ false 
c  in DIMACS:
-10922 -10923 -10924  0

c i = 94
c  -2+1 --> -1
c    ( b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧  p_846) -> ( b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0)
c  in CNF:
c    -b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨  b^{9, 95}_2
c    -b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_1
c    -b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨  b^{9, 95}_0
c  in DIMACS:
-10925 -10926  10927 -846  10928 0
-10925 -10926  10927 -846 -10929 0
-10925 -10926  10927 -846  10930 0

c  -1+1 --> 0
c    ( b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0 ∧  p_846) -> (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧ -b^{9, 95}_0)
c  in CNF:
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_2
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_1
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_0
c  in DIMACS:
-10925  10926 -10927 -846 -10928 0
-10925  10926 -10927 -846 -10929 0
-10925  10926 -10927 -846 -10930 0

c  0+1 --> 1
c    (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧  p_846) -> (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0)
c  in CNF:
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_2
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_1
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨  b^{9, 95}_0
c  in DIMACS:
 10925  10926  10927 -846 -10928 0
 10925  10926  10927 -846 -10929 0
 10925  10926  10927 -846  10930 0

c  1+1 --> 2
c    (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0 ∧  p_846) -> (-b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0)
c  in CNF:
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_2
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨  b^{9, 95}_1
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ -p_846 ∨ -b^{9, 95}_0
c  in DIMACS:
 10925  10926 -10927 -846 -10928 0
 10925  10926 -10927 -846  10929 0
 10925  10926 -10927 -846 -10930 0

c  2+1 --> break 
c    (-b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧  p_846) -> break
c  in CNF:
c     b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 10925 -10926  10927 -846 1162 0


c  2-1 --> 1
c    (-b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧ -p_846) -> (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0)
c  in CNF:
c     b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_2
c     b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_1
c     b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨  b^{9, 95}_0
c  in DIMACS:
 10925 -10926  10927  846 -10928 0
 10925 -10926  10927  846 -10929 0
 10925 -10926  10927  846  10930 0

c  1-1 --> 0
c    (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0 ∧ -p_846) -> (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧ -b^{9, 95}_0)
c  in CNF:
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_2
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_1
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_0
c  in DIMACS:
 10925  10926 -10927  846 -10928 0
 10925  10926 -10927  846 -10929 0
 10925  10926 -10927  846 -10930 0

c  0-1 --> -1
c    (-b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧ -p_846) -> ( b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0)
c  in CNF:
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨  b^{9, 95}_2
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_1
c     b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨  b^{9, 95}_0
c  in DIMACS:
 10925  10926  10927  846  10928 0
 10925  10926  10927  846 -10929 0
 10925  10926  10927  846  10930 0

c  -1-1 --> -2
c    ( b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧  b^{9, 94}_0 ∧ -p_846) -> ( b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0)
c  in CNF:
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨  b^{9, 95}_2
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨  b^{9, 95}_1
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨  p_846 ∨ -b^{9, 95}_0
c  in DIMACS:
-10925  10926 -10927  846  10928 0
-10925  10926 -10927  846  10929 0
-10925  10926 -10927  846 -10930 0

c  -2-1 --> break 
c    ( b^{9, 94}_2 ∧  b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨  b^{9, 94}_0 ∨  p_846 ∨ break
c  in DIMACS:
-10925 -10926  10927  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 94}_2 ∧ -b^{9, 94}_1 ∧ -b^{9, 94}_0 ∧ true) 
c  in CNF:
c    -b^{9, 94}_2 ∨  b^{9, 94}_1 ∨  b^{9, 94}_0 ∨ false 
c  in DIMACS:
-10925  10926  10927  0

c  3 does not represent an automaton state.
c    -(-b^{9, 94}_2 ∧  b^{9, 94}_1 ∧  b^{9, 94}_0 ∧ true) 
c  in CNF:
c     b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ false 
c  in DIMACS:
 10925 -10926 -10927  0
c  -3 does not represent an automaton state.
c    -( b^{9, 94}_2 ∧  b^{9, 94}_1 ∧  b^{9, 94}_0 ∧ true) 
c  in CNF:
c    -b^{9, 94}_2 ∨ -b^{9, 94}_1 ∨ -b^{9, 94}_0 ∨ false 
c  in DIMACS:
-10925 -10926 -10927  0

c i = 95
c  -2+1 --> -1
c    ( b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧  p_855) -> ( b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0)
c  in CNF:
c    -b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨  b^{9, 96}_2
c    -b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_1
c    -b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨  b^{9, 96}_0
c  in DIMACS:
-10928 -10929  10930 -855  10931 0
-10928 -10929  10930 -855 -10932 0
-10928 -10929  10930 -855  10933 0

c  -1+1 --> 0
c    ( b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0 ∧  p_855) -> (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧ -b^{9, 96}_0)
c  in CNF:
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_2
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_1
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_0
c  in DIMACS:
-10928  10929 -10930 -855 -10931 0
-10928  10929 -10930 -855 -10932 0
-10928  10929 -10930 -855 -10933 0

c  0+1 --> 1
c    (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧  p_855) -> (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0)
c  in CNF:
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_2
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_1
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨  b^{9, 96}_0
c  in DIMACS:
 10928  10929  10930 -855 -10931 0
 10928  10929  10930 -855 -10932 0
 10928  10929  10930 -855  10933 0

c  1+1 --> 2
c    (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0 ∧  p_855) -> (-b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0)
c  in CNF:
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_2
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨  b^{9, 96}_1
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ -p_855 ∨ -b^{9, 96}_0
c  in DIMACS:
 10928  10929 -10930 -855 -10931 0
 10928  10929 -10930 -855  10932 0
 10928  10929 -10930 -855 -10933 0

c  2+1 --> break 
c    (-b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧  p_855) -> break
c  in CNF:
c     b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 10928 -10929  10930 -855 1162 0


c  2-1 --> 1
c    (-b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧ -p_855) -> (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0)
c  in CNF:
c     b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_2
c     b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_1
c     b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨  b^{9, 96}_0
c  in DIMACS:
 10928 -10929  10930  855 -10931 0
 10928 -10929  10930  855 -10932 0
 10928 -10929  10930  855  10933 0

c  1-1 --> 0
c    (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0 ∧ -p_855) -> (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧ -b^{9, 96}_0)
c  in CNF:
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_2
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_1
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_0
c  in DIMACS:
 10928  10929 -10930  855 -10931 0
 10928  10929 -10930  855 -10932 0
 10928  10929 -10930  855 -10933 0

c  0-1 --> -1
c    (-b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧ -p_855) -> ( b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0)
c  in CNF:
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨  b^{9, 96}_2
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_1
c     b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨  b^{9, 96}_0
c  in DIMACS:
 10928  10929  10930  855  10931 0
 10928  10929  10930  855 -10932 0
 10928  10929  10930  855  10933 0

c  -1-1 --> -2
c    ( b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧  b^{9, 95}_0 ∧ -p_855) -> ( b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0)
c  in CNF:
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨  b^{9, 96}_2
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨  b^{9, 96}_1
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨  p_855 ∨ -b^{9, 96}_0
c  in DIMACS:
-10928  10929 -10930  855  10931 0
-10928  10929 -10930  855  10932 0
-10928  10929 -10930  855 -10933 0

c  -2-1 --> break 
c    ( b^{9, 95}_2 ∧  b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨  b^{9, 95}_0 ∨  p_855 ∨ break
c  in DIMACS:
-10928 -10929  10930  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 95}_2 ∧ -b^{9, 95}_1 ∧ -b^{9, 95}_0 ∧ true) 
c  in CNF:
c    -b^{9, 95}_2 ∨  b^{9, 95}_1 ∨  b^{9, 95}_0 ∨ false 
c  in DIMACS:
-10928  10929  10930  0

c  3 does not represent an automaton state.
c    -(-b^{9, 95}_2 ∧  b^{9, 95}_1 ∧  b^{9, 95}_0 ∧ true) 
c  in CNF:
c     b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ false 
c  in DIMACS:
 10928 -10929 -10930  0
c  -3 does not represent an automaton state.
c    -( b^{9, 95}_2 ∧  b^{9, 95}_1 ∧  b^{9, 95}_0 ∧ true) 
c  in CNF:
c    -b^{9, 95}_2 ∨ -b^{9, 95}_1 ∨ -b^{9, 95}_0 ∨ false 
c  in DIMACS:
-10928 -10929 -10930  0

c i = 96
c  -2+1 --> -1
c    ( b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧  p_864) -> ( b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0)
c  in CNF:
c    -b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨  b^{9, 97}_2
c    -b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_1
c    -b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨  b^{9, 97}_0
c  in DIMACS:
-10931 -10932  10933 -864  10934 0
-10931 -10932  10933 -864 -10935 0
-10931 -10932  10933 -864  10936 0

c  -1+1 --> 0
c    ( b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0 ∧  p_864) -> (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧ -b^{9, 97}_0)
c  in CNF:
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_2
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_1
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_0
c  in DIMACS:
-10931  10932 -10933 -864 -10934 0
-10931  10932 -10933 -864 -10935 0
-10931  10932 -10933 -864 -10936 0

c  0+1 --> 1
c    (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧  p_864) -> (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0)
c  in CNF:
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_2
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_1
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨  b^{9, 97}_0
c  in DIMACS:
 10931  10932  10933 -864 -10934 0
 10931  10932  10933 -864 -10935 0
 10931  10932  10933 -864  10936 0

c  1+1 --> 2
c    (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0 ∧  p_864) -> (-b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0)
c  in CNF:
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_2
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨  b^{9, 97}_1
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ -p_864 ∨ -b^{9, 97}_0
c  in DIMACS:
 10931  10932 -10933 -864 -10934 0
 10931  10932 -10933 -864  10935 0
 10931  10932 -10933 -864 -10936 0

c  2+1 --> break 
c    (-b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧  p_864) -> break
c  in CNF:
c     b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 10931 -10932  10933 -864 1162 0


c  2-1 --> 1
c    (-b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧ -p_864) -> (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0)
c  in CNF:
c     b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_2
c     b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_1
c     b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨  b^{9, 97}_0
c  in DIMACS:
 10931 -10932  10933  864 -10934 0
 10931 -10932  10933  864 -10935 0
 10931 -10932  10933  864  10936 0

c  1-1 --> 0
c    (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0 ∧ -p_864) -> (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧ -b^{9, 97}_0)
c  in CNF:
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_2
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_1
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_0
c  in DIMACS:
 10931  10932 -10933  864 -10934 0
 10931  10932 -10933  864 -10935 0
 10931  10932 -10933  864 -10936 0

c  0-1 --> -1
c    (-b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧ -p_864) -> ( b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0)
c  in CNF:
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨  b^{9, 97}_2
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_1
c     b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨  b^{9, 97}_0
c  in DIMACS:
 10931  10932  10933  864  10934 0
 10931  10932  10933  864 -10935 0
 10931  10932  10933  864  10936 0

c  -1-1 --> -2
c    ( b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧  b^{9, 96}_0 ∧ -p_864) -> ( b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0)
c  in CNF:
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨  b^{9, 97}_2
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨  b^{9, 97}_1
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨  p_864 ∨ -b^{9, 97}_0
c  in DIMACS:
-10931  10932 -10933  864  10934 0
-10931  10932 -10933  864  10935 0
-10931  10932 -10933  864 -10936 0

c  -2-1 --> break 
c    ( b^{9, 96}_2 ∧  b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨  b^{9, 96}_0 ∨  p_864 ∨ break
c  in DIMACS:
-10931 -10932  10933  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 96}_2 ∧ -b^{9, 96}_1 ∧ -b^{9, 96}_0 ∧ true) 
c  in CNF:
c    -b^{9, 96}_2 ∨  b^{9, 96}_1 ∨  b^{9, 96}_0 ∨ false 
c  in DIMACS:
-10931  10932  10933  0

c  3 does not represent an automaton state.
c    -(-b^{9, 96}_2 ∧  b^{9, 96}_1 ∧  b^{9, 96}_0 ∧ true) 
c  in CNF:
c     b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ false 
c  in DIMACS:
 10931 -10932 -10933  0
c  -3 does not represent an automaton state.
c    -( b^{9, 96}_2 ∧  b^{9, 96}_1 ∧  b^{9, 96}_0 ∧ true) 
c  in CNF:
c    -b^{9, 96}_2 ∨ -b^{9, 96}_1 ∨ -b^{9, 96}_0 ∨ false 
c  in DIMACS:
-10931 -10932 -10933  0

c i = 97
c  -2+1 --> -1
c    ( b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧  p_873) -> ( b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0)
c  in CNF:
c    -b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨  b^{9, 98}_2
c    -b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_1
c    -b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨  b^{9, 98}_0
c  in DIMACS:
-10934 -10935  10936 -873  10937 0
-10934 -10935  10936 -873 -10938 0
-10934 -10935  10936 -873  10939 0

c  -1+1 --> 0
c    ( b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0 ∧  p_873) -> (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧ -b^{9, 98}_0)
c  in CNF:
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_2
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_1
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_0
c  in DIMACS:
-10934  10935 -10936 -873 -10937 0
-10934  10935 -10936 -873 -10938 0
-10934  10935 -10936 -873 -10939 0

c  0+1 --> 1
c    (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧  p_873) -> (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0)
c  in CNF:
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_2
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_1
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨  b^{9, 98}_0
c  in DIMACS:
 10934  10935  10936 -873 -10937 0
 10934  10935  10936 -873 -10938 0
 10934  10935  10936 -873  10939 0

c  1+1 --> 2
c    (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0 ∧  p_873) -> (-b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0)
c  in CNF:
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_2
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨  b^{9, 98}_1
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ -p_873 ∨ -b^{9, 98}_0
c  in DIMACS:
 10934  10935 -10936 -873 -10937 0
 10934  10935 -10936 -873  10938 0
 10934  10935 -10936 -873 -10939 0

c  2+1 --> break 
c    (-b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧  p_873) -> break
c  in CNF:
c     b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ -p_873 ∨ break
c  in DIMACS:
 10934 -10935  10936 -873 1162 0


c  2-1 --> 1
c    (-b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧ -p_873) -> (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0)
c  in CNF:
c     b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_2
c     b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_1
c     b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨  b^{9, 98}_0
c  in DIMACS:
 10934 -10935  10936  873 -10937 0
 10934 -10935  10936  873 -10938 0
 10934 -10935  10936  873  10939 0

c  1-1 --> 0
c    (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0 ∧ -p_873) -> (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧ -b^{9, 98}_0)
c  in CNF:
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_2
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_1
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_0
c  in DIMACS:
 10934  10935 -10936  873 -10937 0
 10934  10935 -10936  873 -10938 0
 10934  10935 -10936  873 -10939 0

c  0-1 --> -1
c    (-b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧ -p_873) -> ( b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0)
c  in CNF:
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨  b^{9, 98}_2
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_1
c     b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨  b^{9, 98}_0
c  in DIMACS:
 10934  10935  10936  873  10937 0
 10934  10935  10936  873 -10938 0
 10934  10935  10936  873  10939 0

c  -1-1 --> -2
c    ( b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧  b^{9, 97}_0 ∧ -p_873) -> ( b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0)
c  in CNF:
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨  b^{9, 98}_2
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨  b^{9, 98}_1
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨  p_873 ∨ -b^{9, 98}_0
c  in DIMACS:
-10934  10935 -10936  873  10937 0
-10934  10935 -10936  873  10938 0
-10934  10935 -10936  873 -10939 0

c  -2-1 --> break 
c    ( b^{9, 97}_2 ∧  b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧ -p_873) -> break
c  in CNF:
c    -b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨  b^{9, 97}_0 ∨  p_873 ∨ break
c  in DIMACS:
-10934 -10935  10936  873 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 97}_2 ∧ -b^{9, 97}_1 ∧ -b^{9, 97}_0 ∧ true) 
c  in CNF:
c    -b^{9, 97}_2 ∨  b^{9, 97}_1 ∨  b^{9, 97}_0 ∨ false 
c  in DIMACS:
-10934  10935  10936  0

c  3 does not represent an automaton state.
c    -(-b^{9, 97}_2 ∧  b^{9, 97}_1 ∧  b^{9, 97}_0 ∧ true) 
c  in CNF:
c     b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ false 
c  in DIMACS:
 10934 -10935 -10936  0
c  -3 does not represent an automaton state.
c    -( b^{9, 97}_2 ∧  b^{9, 97}_1 ∧  b^{9, 97}_0 ∧ true) 
c  in CNF:
c    -b^{9, 97}_2 ∨ -b^{9, 97}_1 ∨ -b^{9, 97}_0 ∨ false 
c  in DIMACS:
-10934 -10935 -10936  0

c i = 98
c  -2+1 --> -1
c    ( b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧  p_882) -> ( b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0)
c  in CNF:
c    -b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨  b^{9, 99}_2
c    -b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_1
c    -b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨  b^{9, 99}_0
c  in DIMACS:
-10937 -10938  10939 -882  10940 0
-10937 -10938  10939 -882 -10941 0
-10937 -10938  10939 -882  10942 0

c  -1+1 --> 0
c    ( b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0 ∧  p_882) -> (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧ -b^{9, 99}_0)
c  in CNF:
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_2
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_1
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_0
c  in DIMACS:
-10937  10938 -10939 -882 -10940 0
-10937  10938 -10939 -882 -10941 0
-10937  10938 -10939 -882 -10942 0

c  0+1 --> 1
c    (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧  p_882) -> (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0)
c  in CNF:
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_2
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_1
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨  b^{9, 99}_0
c  in DIMACS:
 10937  10938  10939 -882 -10940 0
 10937  10938  10939 -882 -10941 0
 10937  10938  10939 -882  10942 0

c  1+1 --> 2
c    (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0 ∧  p_882) -> (-b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0)
c  in CNF:
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_2
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨  b^{9, 99}_1
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ -p_882 ∨ -b^{9, 99}_0
c  in DIMACS:
 10937  10938 -10939 -882 -10940 0
 10937  10938 -10939 -882  10941 0
 10937  10938 -10939 -882 -10942 0

c  2+1 --> break 
c    (-b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧  p_882) -> break
c  in CNF:
c     b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 10937 -10938  10939 -882 1162 0


c  2-1 --> 1
c    (-b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧ -p_882) -> (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0)
c  in CNF:
c     b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_2
c     b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_1
c     b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨  b^{9, 99}_0
c  in DIMACS:
 10937 -10938  10939  882 -10940 0
 10937 -10938  10939  882 -10941 0
 10937 -10938  10939  882  10942 0

c  1-1 --> 0
c    (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0 ∧ -p_882) -> (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧ -b^{9, 99}_0)
c  in CNF:
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_2
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_1
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_0
c  in DIMACS:
 10937  10938 -10939  882 -10940 0
 10937  10938 -10939  882 -10941 0
 10937  10938 -10939  882 -10942 0

c  0-1 --> -1
c    (-b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧ -p_882) -> ( b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0)
c  in CNF:
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨  b^{9, 99}_2
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_1
c     b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨  b^{9, 99}_0
c  in DIMACS:
 10937  10938  10939  882  10940 0
 10937  10938  10939  882 -10941 0
 10937  10938  10939  882  10942 0

c  -1-1 --> -2
c    ( b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧  b^{9, 98}_0 ∧ -p_882) -> ( b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0)
c  in CNF:
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨  b^{9, 99}_2
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨  b^{9, 99}_1
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨  p_882 ∨ -b^{9, 99}_0
c  in DIMACS:
-10937  10938 -10939  882  10940 0
-10937  10938 -10939  882  10941 0
-10937  10938 -10939  882 -10942 0

c  -2-1 --> break 
c    ( b^{9, 98}_2 ∧  b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨  b^{9, 98}_0 ∨  p_882 ∨ break
c  in DIMACS:
-10937 -10938  10939  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 98}_2 ∧ -b^{9, 98}_1 ∧ -b^{9, 98}_0 ∧ true) 
c  in CNF:
c    -b^{9, 98}_2 ∨  b^{9, 98}_1 ∨  b^{9, 98}_0 ∨ false 
c  in DIMACS:
-10937  10938  10939  0

c  3 does not represent an automaton state.
c    -(-b^{9, 98}_2 ∧  b^{9, 98}_1 ∧  b^{9, 98}_0 ∧ true) 
c  in CNF:
c     b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ false 
c  in DIMACS:
 10937 -10938 -10939  0
c  -3 does not represent an automaton state.
c    -( b^{9, 98}_2 ∧  b^{9, 98}_1 ∧  b^{9, 98}_0 ∧ true) 
c  in CNF:
c    -b^{9, 98}_2 ∨ -b^{9, 98}_1 ∨ -b^{9, 98}_0 ∨ false 
c  in DIMACS:
-10937 -10938 -10939  0

c i = 99
c  -2+1 --> -1
c    ( b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧  p_891) -> ( b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0)
c  in CNF:
c    -b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨  b^{9, 100}_2
c    -b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_1
c    -b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨  b^{9, 100}_0
c  in DIMACS:
-10940 -10941  10942 -891  10943 0
-10940 -10941  10942 -891 -10944 0
-10940 -10941  10942 -891  10945 0

c  -1+1 --> 0
c    ( b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0 ∧  p_891) -> (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧ -b^{9, 100}_0)
c  in CNF:
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_2
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_1
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_0
c  in DIMACS:
-10940  10941 -10942 -891 -10943 0
-10940  10941 -10942 -891 -10944 0
-10940  10941 -10942 -891 -10945 0

c  0+1 --> 1
c    (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧  p_891) -> (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0)
c  in CNF:
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_2
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_1
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨  b^{9, 100}_0
c  in DIMACS:
 10940  10941  10942 -891 -10943 0
 10940  10941  10942 -891 -10944 0
 10940  10941  10942 -891  10945 0

c  1+1 --> 2
c    (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0 ∧  p_891) -> (-b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0)
c  in CNF:
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_2
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨  b^{9, 100}_1
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ -p_891 ∨ -b^{9, 100}_0
c  in DIMACS:
 10940  10941 -10942 -891 -10943 0
 10940  10941 -10942 -891  10944 0
 10940  10941 -10942 -891 -10945 0

c  2+1 --> break 
c    (-b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧  p_891) -> break
c  in CNF:
c     b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 10940 -10941  10942 -891 1162 0


c  2-1 --> 1
c    (-b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧ -p_891) -> (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0)
c  in CNF:
c     b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_2
c     b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_1
c     b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨  b^{9, 100}_0
c  in DIMACS:
 10940 -10941  10942  891 -10943 0
 10940 -10941  10942  891 -10944 0
 10940 -10941  10942  891  10945 0

c  1-1 --> 0
c    (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0 ∧ -p_891) -> (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧ -b^{9, 100}_0)
c  in CNF:
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_2
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_1
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_0
c  in DIMACS:
 10940  10941 -10942  891 -10943 0
 10940  10941 -10942  891 -10944 0
 10940  10941 -10942  891 -10945 0

c  0-1 --> -1
c    (-b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧ -p_891) -> ( b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0)
c  in CNF:
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨  b^{9, 100}_2
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_1
c     b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨  b^{9, 100}_0
c  in DIMACS:
 10940  10941  10942  891  10943 0
 10940  10941  10942  891 -10944 0
 10940  10941  10942  891  10945 0

c  -1-1 --> -2
c    ( b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧  b^{9, 99}_0 ∧ -p_891) -> ( b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0)
c  in CNF:
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨  b^{9, 100}_2
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨  b^{9, 100}_1
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨  p_891 ∨ -b^{9, 100}_0
c  in DIMACS:
-10940  10941 -10942  891  10943 0
-10940  10941 -10942  891  10944 0
-10940  10941 -10942  891 -10945 0

c  -2-1 --> break 
c    ( b^{9, 99}_2 ∧  b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨  b^{9, 99}_0 ∨  p_891 ∨ break
c  in DIMACS:
-10940 -10941  10942  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 99}_2 ∧ -b^{9, 99}_1 ∧ -b^{9, 99}_0 ∧ true) 
c  in CNF:
c    -b^{9, 99}_2 ∨  b^{9, 99}_1 ∨  b^{9, 99}_0 ∨ false 
c  in DIMACS:
-10940  10941  10942  0

c  3 does not represent an automaton state.
c    -(-b^{9, 99}_2 ∧  b^{9, 99}_1 ∧  b^{9, 99}_0 ∧ true) 
c  in CNF:
c     b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ false 
c  in DIMACS:
 10940 -10941 -10942  0
c  -3 does not represent an automaton state.
c    -( b^{9, 99}_2 ∧  b^{9, 99}_1 ∧  b^{9, 99}_0 ∧ true) 
c  in CNF:
c    -b^{9, 99}_2 ∨ -b^{9, 99}_1 ∨ -b^{9, 99}_0 ∨ false 
c  in DIMACS:
-10940 -10941 -10942  0

c i = 100
c  -2+1 --> -1
c    ( b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧  p_900) -> ( b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0)
c  in CNF:
c    -b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨  b^{9, 101}_2
c    -b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_1
c    -b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨  b^{9, 101}_0
c  in DIMACS:
-10943 -10944  10945 -900  10946 0
-10943 -10944  10945 -900 -10947 0
-10943 -10944  10945 -900  10948 0

c  -1+1 --> 0
c    ( b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0 ∧  p_900) -> (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧ -b^{9, 101}_0)
c  in CNF:
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_2
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_1
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_0
c  in DIMACS:
-10943  10944 -10945 -900 -10946 0
-10943  10944 -10945 -900 -10947 0
-10943  10944 -10945 -900 -10948 0

c  0+1 --> 1
c    (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧  p_900) -> (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0)
c  in CNF:
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_2
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_1
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨  b^{9, 101}_0
c  in DIMACS:
 10943  10944  10945 -900 -10946 0
 10943  10944  10945 -900 -10947 0
 10943  10944  10945 -900  10948 0

c  1+1 --> 2
c    (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0 ∧  p_900) -> (-b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0)
c  in CNF:
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_2
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨  b^{9, 101}_1
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ -p_900 ∨ -b^{9, 101}_0
c  in DIMACS:
 10943  10944 -10945 -900 -10946 0
 10943  10944 -10945 -900  10947 0
 10943  10944 -10945 -900 -10948 0

c  2+1 --> break 
c    (-b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧  p_900) -> break
c  in CNF:
c     b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 10943 -10944  10945 -900 1162 0


c  2-1 --> 1
c    (-b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧ -p_900) -> (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0)
c  in CNF:
c     b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_2
c     b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_1
c     b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨  b^{9, 101}_0
c  in DIMACS:
 10943 -10944  10945  900 -10946 0
 10943 -10944  10945  900 -10947 0
 10943 -10944  10945  900  10948 0

c  1-1 --> 0
c    (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0 ∧ -p_900) -> (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧ -b^{9, 101}_0)
c  in CNF:
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_2
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_1
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_0
c  in DIMACS:
 10943  10944 -10945  900 -10946 0
 10943  10944 -10945  900 -10947 0
 10943  10944 -10945  900 -10948 0

c  0-1 --> -1
c    (-b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧ -p_900) -> ( b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0)
c  in CNF:
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨  b^{9, 101}_2
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_1
c     b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨  b^{9, 101}_0
c  in DIMACS:
 10943  10944  10945  900  10946 0
 10943  10944  10945  900 -10947 0
 10943  10944  10945  900  10948 0

c  -1-1 --> -2
c    ( b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧  b^{9, 100}_0 ∧ -p_900) -> ( b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0)
c  in CNF:
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨  b^{9, 101}_2
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨  b^{9, 101}_1
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨  p_900 ∨ -b^{9, 101}_0
c  in DIMACS:
-10943  10944 -10945  900  10946 0
-10943  10944 -10945  900  10947 0
-10943  10944 -10945  900 -10948 0

c  -2-1 --> break 
c    ( b^{9, 100}_2 ∧  b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨  b^{9, 100}_0 ∨  p_900 ∨ break
c  in DIMACS:
-10943 -10944  10945  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 100}_2 ∧ -b^{9, 100}_1 ∧ -b^{9, 100}_0 ∧ true) 
c  in CNF:
c    -b^{9, 100}_2 ∨  b^{9, 100}_1 ∨  b^{9, 100}_0 ∨ false 
c  in DIMACS:
-10943  10944  10945  0

c  3 does not represent an automaton state.
c    -(-b^{9, 100}_2 ∧  b^{9, 100}_1 ∧  b^{9, 100}_0 ∧ true) 
c  in CNF:
c     b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ false 
c  in DIMACS:
 10943 -10944 -10945  0
c  -3 does not represent an automaton state.
c    -( b^{9, 100}_2 ∧  b^{9, 100}_1 ∧  b^{9, 100}_0 ∧ true) 
c  in CNF:
c    -b^{9, 100}_2 ∨ -b^{9, 100}_1 ∨ -b^{9, 100}_0 ∨ false 
c  in DIMACS:
-10943 -10944 -10945  0

c i = 101
c  -2+1 --> -1
c    ( b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧  p_909) -> ( b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0)
c  in CNF:
c    -b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨  b^{9, 102}_2
c    -b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_1
c    -b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨  b^{9, 102}_0
c  in DIMACS:
-10946 -10947  10948 -909  10949 0
-10946 -10947  10948 -909 -10950 0
-10946 -10947  10948 -909  10951 0

c  -1+1 --> 0
c    ( b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0 ∧  p_909) -> (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧ -b^{9, 102}_0)
c  in CNF:
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_2
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_1
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_0
c  in DIMACS:
-10946  10947 -10948 -909 -10949 0
-10946  10947 -10948 -909 -10950 0
-10946  10947 -10948 -909 -10951 0

c  0+1 --> 1
c    (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧  p_909) -> (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0)
c  in CNF:
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_2
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_1
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨  b^{9, 102}_0
c  in DIMACS:
 10946  10947  10948 -909 -10949 0
 10946  10947  10948 -909 -10950 0
 10946  10947  10948 -909  10951 0

c  1+1 --> 2
c    (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0 ∧  p_909) -> (-b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0)
c  in CNF:
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_2
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨  b^{9, 102}_1
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ -p_909 ∨ -b^{9, 102}_0
c  in DIMACS:
 10946  10947 -10948 -909 -10949 0
 10946  10947 -10948 -909  10950 0
 10946  10947 -10948 -909 -10951 0

c  2+1 --> break 
c    (-b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧  p_909) -> break
c  in CNF:
c     b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ -p_909 ∨ break
c  in DIMACS:
 10946 -10947  10948 -909 1162 0


c  2-1 --> 1
c    (-b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧ -p_909) -> (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0)
c  in CNF:
c     b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_2
c     b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_1
c     b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨  b^{9, 102}_0
c  in DIMACS:
 10946 -10947  10948  909 -10949 0
 10946 -10947  10948  909 -10950 0
 10946 -10947  10948  909  10951 0

c  1-1 --> 0
c    (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0 ∧ -p_909) -> (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧ -b^{9, 102}_0)
c  in CNF:
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_2
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_1
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_0
c  in DIMACS:
 10946  10947 -10948  909 -10949 0
 10946  10947 -10948  909 -10950 0
 10946  10947 -10948  909 -10951 0

c  0-1 --> -1
c    (-b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧ -p_909) -> ( b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0)
c  in CNF:
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨  b^{9, 102}_2
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_1
c     b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨  b^{9, 102}_0
c  in DIMACS:
 10946  10947  10948  909  10949 0
 10946  10947  10948  909 -10950 0
 10946  10947  10948  909  10951 0

c  -1-1 --> -2
c    ( b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧  b^{9, 101}_0 ∧ -p_909) -> ( b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0)
c  in CNF:
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨  b^{9, 102}_2
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨  b^{9, 102}_1
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨  p_909 ∨ -b^{9, 102}_0
c  in DIMACS:
-10946  10947 -10948  909  10949 0
-10946  10947 -10948  909  10950 0
-10946  10947 -10948  909 -10951 0

c  -2-1 --> break 
c    ( b^{9, 101}_2 ∧  b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧ -p_909) -> break
c  in CNF:
c    -b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨  b^{9, 101}_0 ∨  p_909 ∨ break
c  in DIMACS:
-10946 -10947  10948  909 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 101}_2 ∧ -b^{9, 101}_1 ∧ -b^{9, 101}_0 ∧ true) 
c  in CNF:
c    -b^{9, 101}_2 ∨  b^{9, 101}_1 ∨  b^{9, 101}_0 ∨ false 
c  in DIMACS:
-10946  10947  10948  0

c  3 does not represent an automaton state.
c    -(-b^{9, 101}_2 ∧  b^{9, 101}_1 ∧  b^{9, 101}_0 ∧ true) 
c  in CNF:
c     b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ false 
c  in DIMACS:
 10946 -10947 -10948  0
c  -3 does not represent an automaton state.
c    -( b^{9, 101}_2 ∧  b^{9, 101}_1 ∧  b^{9, 101}_0 ∧ true) 
c  in CNF:
c    -b^{9, 101}_2 ∨ -b^{9, 101}_1 ∨ -b^{9, 101}_0 ∨ false 
c  in DIMACS:
-10946 -10947 -10948  0

c i = 102
c  -2+1 --> -1
c    ( b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧  p_918) -> ( b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0)
c  in CNF:
c    -b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨  b^{9, 103}_2
c    -b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_1
c    -b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨  b^{9, 103}_0
c  in DIMACS:
-10949 -10950  10951 -918  10952 0
-10949 -10950  10951 -918 -10953 0
-10949 -10950  10951 -918  10954 0

c  -1+1 --> 0
c    ( b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0 ∧  p_918) -> (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧ -b^{9, 103}_0)
c  in CNF:
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_2
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_1
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_0
c  in DIMACS:
-10949  10950 -10951 -918 -10952 0
-10949  10950 -10951 -918 -10953 0
-10949  10950 -10951 -918 -10954 0

c  0+1 --> 1
c    (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧  p_918) -> (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0)
c  in CNF:
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_2
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_1
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨  b^{9, 103}_0
c  in DIMACS:
 10949  10950  10951 -918 -10952 0
 10949  10950  10951 -918 -10953 0
 10949  10950  10951 -918  10954 0

c  1+1 --> 2
c    (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0 ∧  p_918) -> (-b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0)
c  in CNF:
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_2
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨  b^{9, 103}_1
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ -p_918 ∨ -b^{9, 103}_0
c  in DIMACS:
 10949  10950 -10951 -918 -10952 0
 10949  10950 -10951 -918  10953 0
 10949  10950 -10951 -918 -10954 0

c  2+1 --> break 
c    (-b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧  p_918) -> break
c  in CNF:
c     b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 10949 -10950  10951 -918 1162 0


c  2-1 --> 1
c    (-b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧ -p_918) -> (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0)
c  in CNF:
c     b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_2
c     b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_1
c     b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨  b^{9, 103}_0
c  in DIMACS:
 10949 -10950  10951  918 -10952 0
 10949 -10950  10951  918 -10953 0
 10949 -10950  10951  918  10954 0

c  1-1 --> 0
c    (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0 ∧ -p_918) -> (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧ -b^{9, 103}_0)
c  in CNF:
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_2
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_1
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_0
c  in DIMACS:
 10949  10950 -10951  918 -10952 0
 10949  10950 -10951  918 -10953 0
 10949  10950 -10951  918 -10954 0

c  0-1 --> -1
c    (-b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧ -p_918) -> ( b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0)
c  in CNF:
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨  b^{9, 103}_2
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_1
c     b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨  b^{9, 103}_0
c  in DIMACS:
 10949  10950  10951  918  10952 0
 10949  10950  10951  918 -10953 0
 10949  10950  10951  918  10954 0

c  -1-1 --> -2
c    ( b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧  b^{9, 102}_0 ∧ -p_918) -> ( b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0)
c  in CNF:
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨  b^{9, 103}_2
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨  b^{9, 103}_1
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨  p_918 ∨ -b^{9, 103}_0
c  in DIMACS:
-10949  10950 -10951  918  10952 0
-10949  10950 -10951  918  10953 0
-10949  10950 -10951  918 -10954 0

c  -2-1 --> break 
c    ( b^{9, 102}_2 ∧  b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨  b^{9, 102}_0 ∨  p_918 ∨ break
c  in DIMACS:
-10949 -10950  10951  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 102}_2 ∧ -b^{9, 102}_1 ∧ -b^{9, 102}_0 ∧ true) 
c  in CNF:
c    -b^{9, 102}_2 ∨  b^{9, 102}_1 ∨  b^{9, 102}_0 ∨ false 
c  in DIMACS:
-10949  10950  10951  0

c  3 does not represent an automaton state.
c    -(-b^{9, 102}_2 ∧  b^{9, 102}_1 ∧  b^{9, 102}_0 ∧ true) 
c  in CNF:
c     b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ false 
c  in DIMACS:
 10949 -10950 -10951  0
c  -3 does not represent an automaton state.
c    -( b^{9, 102}_2 ∧  b^{9, 102}_1 ∧  b^{9, 102}_0 ∧ true) 
c  in CNF:
c    -b^{9, 102}_2 ∨ -b^{9, 102}_1 ∨ -b^{9, 102}_0 ∨ false 
c  in DIMACS:
-10949 -10950 -10951  0

c i = 103
c  -2+1 --> -1
c    ( b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧  p_927) -> ( b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0)
c  in CNF:
c    -b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨  b^{9, 104}_2
c    -b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_1
c    -b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨  b^{9, 104}_0
c  in DIMACS:
-10952 -10953  10954 -927  10955 0
-10952 -10953  10954 -927 -10956 0
-10952 -10953  10954 -927  10957 0

c  -1+1 --> 0
c    ( b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0 ∧  p_927) -> (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧ -b^{9, 104}_0)
c  in CNF:
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_2
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_1
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_0
c  in DIMACS:
-10952  10953 -10954 -927 -10955 0
-10952  10953 -10954 -927 -10956 0
-10952  10953 -10954 -927 -10957 0

c  0+1 --> 1
c    (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧  p_927) -> (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0)
c  in CNF:
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_2
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_1
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨  b^{9, 104}_0
c  in DIMACS:
 10952  10953  10954 -927 -10955 0
 10952  10953  10954 -927 -10956 0
 10952  10953  10954 -927  10957 0

c  1+1 --> 2
c    (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0 ∧  p_927) -> (-b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0)
c  in CNF:
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_2
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨  b^{9, 104}_1
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ -p_927 ∨ -b^{9, 104}_0
c  in DIMACS:
 10952  10953 -10954 -927 -10955 0
 10952  10953 -10954 -927  10956 0
 10952  10953 -10954 -927 -10957 0

c  2+1 --> break 
c    (-b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧  p_927) -> break
c  in CNF:
c     b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ -p_927 ∨ break
c  in DIMACS:
 10952 -10953  10954 -927 1162 0


c  2-1 --> 1
c    (-b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧ -p_927) -> (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0)
c  in CNF:
c     b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_2
c     b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_1
c     b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨  b^{9, 104}_0
c  in DIMACS:
 10952 -10953  10954  927 -10955 0
 10952 -10953  10954  927 -10956 0
 10952 -10953  10954  927  10957 0

c  1-1 --> 0
c    (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0 ∧ -p_927) -> (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧ -b^{9, 104}_0)
c  in CNF:
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_2
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_1
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_0
c  in DIMACS:
 10952  10953 -10954  927 -10955 0
 10952  10953 -10954  927 -10956 0
 10952  10953 -10954  927 -10957 0

c  0-1 --> -1
c    (-b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧ -p_927) -> ( b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0)
c  in CNF:
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨  b^{9, 104}_2
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_1
c     b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨  b^{9, 104}_0
c  in DIMACS:
 10952  10953  10954  927  10955 0
 10952  10953  10954  927 -10956 0
 10952  10953  10954  927  10957 0

c  -1-1 --> -2
c    ( b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧  b^{9, 103}_0 ∧ -p_927) -> ( b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0)
c  in CNF:
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨  b^{9, 104}_2
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨  b^{9, 104}_1
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨  p_927 ∨ -b^{9, 104}_0
c  in DIMACS:
-10952  10953 -10954  927  10955 0
-10952  10953 -10954  927  10956 0
-10952  10953 -10954  927 -10957 0

c  -2-1 --> break 
c    ( b^{9, 103}_2 ∧  b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧ -p_927) -> break
c  in CNF:
c    -b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨  b^{9, 103}_0 ∨  p_927 ∨ break
c  in DIMACS:
-10952 -10953  10954  927 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 103}_2 ∧ -b^{9, 103}_1 ∧ -b^{9, 103}_0 ∧ true) 
c  in CNF:
c    -b^{9, 103}_2 ∨  b^{9, 103}_1 ∨  b^{9, 103}_0 ∨ false 
c  in DIMACS:
-10952  10953  10954  0

c  3 does not represent an automaton state.
c    -(-b^{9, 103}_2 ∧  b^{9, 103}_1 ∧  b^{9, 103}_0 ∧ true) 
c  in CNF:
c     b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ false 
c  in DIMACS:
 10952 -10953 -10954  0
c  -3 does not represent an automaton state.
c    -( b^{9, 103}_2 ∧  b^{9, 103}_1 ∧  b^{9, 103}_0 ∧ true) 
c  in CNF:
c    -b^{9, 103}_2 ∨ -b^{9, 103}_1 ∨ -b^{9, 103}_0 ∨ false 
c  in DIMACS:
-10952 -10953 -10954  0

c i = 104
c  -2+1 --> -1
c    ( b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧  p_936) -> ( b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0)
c  in CNF:
c    -b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨  b^{9, 105}_2
c    -b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_1
c    -b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨  b^{9, 105}_0
c  in DIMACS:
-10955 -10956  10957 -936  10958 0
-10955 -10956  10957 -936 -10959 0
-10955 -10956  10957 -936  10960 0

c  -1+1 --> 0
c    ( b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0 ∧  p_936) -> (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧ -b^{9, 105}_0)
c  in CNF:
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_2
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_1
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_0
c  in DIMACS:
-10955  10956 -10957 -936 -10958 0
-10955  10956 -10957 -936 -10959 0
-10955  10956 -10957 -936 -10960 0

c  0+1 --> 1
c    (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧  p_936) -> (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0)
c  in CNF:
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_2
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_1
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨  b^{9, 105}_0
c  in DIMACS:
 10955  10956  10957 -936 -10958 0
 10955  10956  10957 -936 -10959 0
 10955  10956  10957 -936  10960 0

c  1+1 --> 2
c    (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0 ∧  p_936) -> (-b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0)
c  in CNF:
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_2
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨  b^{9, 105}_1
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ -p_936 ∨ -b^{9, 105}_0
c  in DIMACS:
 10955  10956 -10957 -936 -10958 0
 10955  10956 -10957 -936  10959 0
 10955  10956 -10957 -936 -10960 0

c  2+1 --> break 
c    (-b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧  p_936) -> break
c  in CNF:
c     b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 10955 -10956  10957 -936 1162 0


c  2-1 --> 1
c    (-b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧ -p_936) -> (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0)
c  in CNF:
c     b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_2
c     b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_1
c     b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨  b^{9, 105}_0
c  in DIMACS:
 10955 -10956  10957  936 -10958 0
 10955 -10956  10957  936 -10959 0
 10955 -10956  10957  936  10960 0

c  1-1 --> 0
c    (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0 ∧ -p_936) -> (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧ -b^{9, 105}_0)
c  in CNF:
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_2
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_1
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_0
c  in DIMACS:
 10955  10956 -10957  936 -10958 0
 10955  10956 -10957  936 -10959 0
 10955  10956 -10957  936 -10960 0

c  0-1 --> -1
c    (-b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧ -p_936) -> ( b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0)
c  in CNF:
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨  b^{9, 105}_2
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_1
c     b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨  b^{9, 105}_0
c  in DIMACS:
 10955  10956  10957  936  10958 0
 10955  10956  10957  936 -10959 0
 10955  10956  10957  936  10960 0

c  -1-1 --> -2
c    ( b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧  b^{9, 104}_0 ∧ -p_936) -> ( b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0)
c  in CNF:
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨  b^{9, 105}_2
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨  b^{9, 105}_1
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨  p_936 ∨ -b^{9, 105}_0
c  in DIMACS:
-10955  10956 -10957  936  10958 0
-10955  10956 -10957  936  10959 0
-10955  10956 -10957  936 -10960 0

c  -2-1 --> break 
c    ( b^{9, 104}_2 ∧  b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨  b^{9, 104}_0 ∨  p_936 ∨ break
c  in DIMACS:
-10955 -10956  10957  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 104}_2 ∧ -b^{9, 104}_1 ∧ -b^{9, 104}_0 ∧ true) 
c  in CNF:
c    -b^{9, 104}_2 ∨  b^{9, 104}_1 ∨  b^{9, 104}_0 ∨ false 
c  in DIMACS:
-10955  10956  10957  0

c  3 does not represent an automaton state.
c    -(-b^{9, 104}_2 ∧  b^{9, 104}_1 ∧  b^{9, 104}_0 ∧ true) 
c  in CNF:
c     b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ false 
c  in DIMACS:
 10955 -10956 -10957  0
c  -3 does not represent an automaton state.
c    -( b^{9, 104}_2 ∧  b^{9, 104}_1 ∧  b^{9, 104}_0 ∧ true) 
c  in CNF:
c    -b^{9, 104}_2 ∨ -b^{9, 104}_1 ∨ -b^{9, 104}_0 ∨ false 
c  in DIMACS:
-10955 -10956 -10957  0

c i = 105
c  -2+1 --> -1
c    ( b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧  p_945) -> ( b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0)
c  in CNF:
c    -b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨  b^{9, 106}_2
c    -b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_1
c    -b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨  b^{9, 106}_0
c  in DIMACS:
-10958 -10959  10960 -945  10961 0
-10958 -10959  10960 -945 -10962 0
-10958 -10959  10960 -945  10963 0

c  -1+1 --> 0
c    ( b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0 ∧  p_945) -> (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧ -b^{9, 106}_0)
c  in CNF:
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_2
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_1
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_0
c  in DIMACS:
-10958  10959 -10960 -945 -10961 0
-10958  10959 -10960 -945 -10962 0
-10958  10959 -10960 -945 -10963 0

c  0+1 --> 1
c    (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧  p_945) -> (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0)
c  in CNF:
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_2
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_1
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨  b^{9, 106}_0
c  in DIMACS:
 10958  10959  10960 -945 -10961 0
 10958  10959  10960 -945 -10962 0
 10958  10959  10960 -945  10963 0

c  1+1 --> 2
c    (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0 ∧  p_945) -> (-b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0)
c  in CNF:
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_2
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨  b^{9, 106}_1
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ -p_945 ∨ -b^{9, 106}_0
c  in DIMACS:
 10958  10959 -10960 -945 -10961 0
 10958  10959 -10960 -945  10962 0
 10958  10959 -10960 -945 -10963 0

c  2+1 --> break 
c    (-b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧  p_945) -> break
c  in CNF:
c     b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 10958 -10959  10960 -945 1162 0


c  2-1 --> 1
c    (-b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧ -p_945) -> (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0)
c  in CNF:
c     b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_2
c     b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_1
c     b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨  b^{9, 106}_0
c  in DIMACS:
 10958 -10959  10960  945 -10961 0
 10958 -10959  10960  945 -10962 0
 10958 -10959  10960  945  10963 0

c  1-1 --> 0
c    (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0 ∧ -p_945) -> (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧ -b^{9, 106}_0)
c  in CNF:
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_2
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_1
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_0
c  in DIMACS:
 10958  10959 -10960  945 -10961 0
 10958  10959 -10960  945 -10962 0
 10958  10959 -10960  945 -10963 0

c  0-1 --> -1
c    (-b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧ -p_945) -> ( b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0)
c  in CNF:
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨  b^{9, 106}_2
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_1
c     b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨  b^{9, 106}_0
c  in DIMACS:
 10958  10959  10960  945  10961 0
 10958  10959  10960  945 -10962 0
 10958  10959  10960  945  10963 0

c  -1-1 --> -2
c    ( b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧  b^{9, 105}_0 ∧ -p_945) -> ( b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0)
c  in CNF:
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨  b^{9, 106}_2
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨  b^{9, 106}_1
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨  p_945 ∨ -b^{9, 106}_0
c  in DIMACS:
-10958  10959 -10960  945  10961 0
-10958  10959 -10960  945  10962 0
-10958  10959 -10960  945 -10963 0

c  -2-1 --> break 
c    ( b^{9, 105}_2 ∧  b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨  b^{9, 105}_0 ∨  p_945 ∨ break
c  in DIMACS:
-10958 -10959  10960  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 105}_2 ∧ -b^{9, 105}_1 ∧ -b^{9, 105}_0 ∧ true) 
c  in CNF:
c    -b^{9, 105}_2 ∨  b^{9, 105}_1 ∨  b^{9, 105}_0 ∨ false 
c  in DIMACS:
-10958  10959  10960  0

c  3 does not represent an automaton state.
c    -(-b^{9, 105}_2 ∧  b^{9, 105}_1 ∧  b^{9, 105}_0 ∧ true) 
c  in CNF:
c     b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ false 
c  in DIMACS:
 10958 -10959 -10960  0
c  -3 does not represent an automaton state.
c    -( b^{9, 105}_2 ∧  b^{9, 105}_1 ∧  b^{9, 105}_0 ∧ true) 
c  in CNF:
c    -b^{9, 105}_2 ∨ -b^{9, 105}_1 ∨ -b^{9, 105}_0 ∨ false 
c  in DIMACS:
-10958 -10959 -10960  0

c i = 106
c  -2+1 --> -1
c    ( b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧  p_954) -> ( b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0)
c  in CNF:
c    -b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨  b^{9, 107}_2
c    -b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_1
c    -b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨  b^{9, 107}_0
c  in DIMACS:
-10961 -10962  10963 -954  10964 0
-10961 -10962  10963 -954 -10965 0
-10961 -10962  10963 -954  10966 0

c  -1+1 --> 0
c    ( b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0 ∧  p_954) -> (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧ -b^{9, 107}_0)
c  in CNF:
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_2
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_1
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_0
c  in DIMACS:
-10961  10962 -10963 -954 -10964 0
-10961  10962 -10963 -954 -10965 0
-10961  10962 -10963 -954 -10966 0

c  0+1 --> 1
c    (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧  p_954) -> (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0)
c  in CNF:
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_2
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_1
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨  b^{9, 107}_0
c  in DIMACS:
 10961  10962  10963 -954 -10964 0
 10961  10962  10963 -954 -10965 0
 10961  10962  10963 -954  10966 0

c  1+1 --> 2
c    (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0 ∧  p_954) -> (-b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0)
c  in CNF:
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_2
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨  b^{9, 107}_1
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ -p_954 ∨ -b^{9, 107}_0
c  in DIMACS:
 10961  10962 -10963 -954 -10964 0
 10961  10962 -10963 -954  10965 0
 10961  10962 -10963 -954 -10966 0

c  2+1 --> break 
c    (-b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧  p_954) -> break
c  in CNF:
c     b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 10961 -10962  10963 -954 1162 0


c  2-1 --> 1
c    (-b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧ -p_954) -> (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0)
c  in CNF:
c     b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_2
c     b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_1
c     b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨  b^{9, 107}_0
c  in DIMACS:
 10961 -10962  10963  954 -10964 0
 10961 -10962  10963  954 -10965 0
 10961 -10962  10963  954  10966 0

c  1-1 --> 0
c    (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0 ∧ -p_954) -> (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧ -b^{9, 107}_0)
c  in CNF:
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_2
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_1
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_0
c  in DIMACS:
 10961  10962 -10963  954 -10964 0
 10961  10962 -10963  954 -10965 0
 10961  10962 -10963  954 -10966 0

c  0-1 --> -1
c    (-b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧ -p_954) -> ( b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0)
c  in CNF:
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨  b^{9, 107}_2
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_1
c     b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨  b^{9, 107}_0
c  in DIMACS:
 10961  10962  10963  954  10964 0
 10961  10962  10963  954 -10965 0
 10961  10962  10963  954  10966 0

c  -1-1 --> -2
c    ( b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧  b^{9, 106}_0 ∧ -p_954) -> ( b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0)
c  in CNF:
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨  b^{9, 107}_2
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨  b^{9, 107}_1
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨  p_954 ∨ -b^{9, 107}_0
c  in DIMACS:
-10961  10962 -10963  954  10964 0
-10961  10962 -10963  954  10965 0
-10961  10962 -10963  954 -10966 0

c  -2-1 --> break 
c    ( b^{9, 106}_2 ∧  b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨  b^{9, 106}_0 ∨  p_954 ∨ break
c  in DIMACS:
-10961 -10962  10963  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 106}_2 ∧ -b^{9, 106}_1 ∧ -b^{9, 106}_0 ∧ true) 
c  in CNF:
c    -b^{9, 106}_2 ∨  b^{9, 106}_1 ∨  b^{9, 106}_0 ∨ false 
c  in DIMACS:
-10961  10962  10963  0

c  3 does not represent an automaton state.
c    -(-b^{9, 106}_2 ∧  b^{9, 106}_1 ∧  b^{9, 106}_0 ∧ true) 
c  in CNF:
c     b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ false 
c  in DIMACS:
 10961 -10962 -10963  0
c  -3 does not represent an automaton state.
c    -( b^{9, 106}_2 ∧  b^{9, 106}_1 ∧  b^{9, 106}_0 ∧ true) 
c  in CNF:
c    -b^{9, 106}_2 ∨ -b^{9, 106}_1 ∨ -b^{9, 106}_0 ∨ false 
c  in DIMACS:
-10961 -10962 -10963  0

c i = 107
c  -2+1 --> -1
c    ( b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧  p_963) -> ( b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0)
c  in CNF:
c    -b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨  b^{9, 108}_2
c    -b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_1
c    -b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨  b^{9, 108}_0
c  in DIMACS:
-10964 -10965  10966 -963  10967 0
-10964 -10965  10966 -963 -10968 0
-10964 -10965  10966 -963  10969 0

c  -1+1 --> 0
c    ( b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0 ∧  p_963) -> (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧ -b^{9, 108}_0)
c  in CNF:
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_2
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_1
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_0
c  in DIMACS:
-10964  10965 -10966 -963 -10967 0
-10964  10965 -10966 -963 -10968 0
-10964  10965 -10966 -963 -10969 0

c  0+1 --> 1
c    (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧  p_963) -> (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0)
c  in CNF:
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_2
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_1
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨  b^{9, 108}_0
c  in DIMACS:
 10964  10965  10966 -963 -10967 0
 10964  10965  10966 -963 -10968 0
 10964  10965  10966 -963  10969 0

c  1+1 --> 2
c    (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0 ∧  p_963) -> (-b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0)
c  in CNF:
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_2
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨  b^{9, 108}_1
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ -p_963 ∨ -b^{9, 108}_0
c  in DIMACS:
 10964  10965 -10966 -963 -10967 0
 10964  10965 -10966 -963  10968 0
 10964  10965 -10966 -963 -10969 0

c  2+1 --> break 
c    (-b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧  p_963) -> break
c  in CNF:
c     b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ -p_963 ∨ break
c  in DIMACS:
 10964 -10965  10966 -963 1162 0


c  2-1 --> 1
c    (-b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧ -p_963) -> (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0)
c  in CNF:
c     b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_2
c     b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_1
c     b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨  b^{9, 108}_0
c  in DIMACS:
 10964 -10965  10966  963 -10967 0
 10964 -10965  10966  963 -10968 0
 10964 -10965  10966  963  10969 0

c  1-1 --> 0
c    (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0 ∧ -p_963) -> (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧ -b^{9, 108}_0)
c  in CNF:
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_2
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_1
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_0
c  in DIMACS:
 10964  10965 -10966  963 -10967 0
 10964  10965 -10966  963 -10968 0
 10964  10965 -10966  963 -10969 0

c  0-1 --> -1
c    (-b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧ -p_963) -> ( b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0)
c  in CNF:
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨  b^{9, 108}_2
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_1
c     b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨  b^{9, 108}_0
c  in DIMACS:
 10964  10965  10966  963  10967 0
 10964  10965  10966  963 -10968 0
 10964  10965  10966  963  10969 0

c  -1-1 --> -2
c    ( b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧  b^{9, 107}_0 ∧ -p_963) -> ( b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0)
c  in CNF:
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨  b^{9, 108}_2
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨  b^{9, 108}_1
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨  p_963 ∨ -b^{9, 108}_0
c  in DIMACS:
-10964  10965 -10966  963  10967 0
-10964  10965 -10966  963  10968 0
-10964  10965 -10966  963 -10969 0

c  -2-1 --> break 
c    ( b^{9, 107}_2 ∧  b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧ -p_963) -> break
c  in CNF:
c    -b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨  b^{9, 107}_0 ∨  p_963 ∨ break
c  in DIMACS:
-10964 -10965  10966  963 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 107}_2 ∧ -b^{9, 107}_1 ∧ -b^{9, 107}_0 ∧ true) 
c  in CNF:
c    -b^{9, 107}_2 ∨  b^{9, 107}_1 ∨  b^{9, 107}_0 ∨ false 
c  in DIMACS:
-10964  10965  10966  0

c  3 does not represent an automaton state.
c    -(-b^{9, 107}_2 ∧  b^{9, 107}_1 ∧  b^{9, 107}_0 ∧ true) 
c  in CNF:
c     b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ false 
c  in DIMACS:
 10964 -10965 -10966  0
c  -3 does not represent an automaton state.
c    -( b^{9, 107}_2 ∧  b^{9, 107}_1 ∧  b^{9, 107}_0 ∧ true) 
c  in CNF:
c    -b^{9, 107}_2 ∨ -b^{9, 107}_1 ∨ -b^{9, 107}_0 ∨ false 
c  in DIMACS:
-10964 -10965 -10966  0

c i = 108
c  -2+1 --> -1
c    ( b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧  p_972) -> ( b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0)
c  in CNF:
c    -b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨  b^{9, 109}_2
c    -b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_1
c    -b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨  b^{9, 109}_0
c  in DIMACS:
-10967 -10968  10969 -972  10970 0
-10967 -10968  10969 -972 -10971 0
-10967 -10968  10969 -972  10972 0

c  -1+1 --> 0
c    ( b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0 ∧  p_972) -> (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧ -b^{9, 109}_0)
c  in CNF:
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_2
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_1
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_0
c  in DIMACS:
-10967  10968 -10969 -972 -10970 0
-10967  10968 -10969 -972 -10971 0
-10967  10968 -10969 -972 -10972 0

c  0+1 --> 1
c    (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧  p_972) -> (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0)
c  in CNF:
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_2
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_1
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨  b^{9, 109}_0
c  in DIMACS:
 10967  10968  10969 -972 -10970 0
 10967  10968  10969 -972 -10971 0
 10967  10968  10969 -972  10972 0

c  1+1 --> 2
c    (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0 ∧  p_972) -> (-b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0)
c  in CNF:
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_2
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨  b^{9, 109}_1
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ -p_972 ∨ -b^{9, 109}_0
c  in DIMACS:
 10967  10968 -10969 -972 -10970 0
 10967  10968 -10969 -972  10971 0
 10967  10968 -10969 -972 -10972 0

c  2+1 --> break 
c    (-b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧  p_972) -> break
c  in CNF:
c     b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 10967 -10968  10969 -972 1162 0


c  2-1 --> 1
c    (-b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧ -p_972) -> (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0)
c  in CNF:
c     b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_2
c     b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_1
c     b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨  b^{9, 109}_0
c  in DIMACS:
 10967 -10968  10969  972 -10970 0
 10967 -10968  10969  972 -10971 0
 10967 -10968  10969  972  10972 0

c  1-1 --> 0
c    (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0 ∧ -p_972) -> (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧ -b^{9, 109}_0)
c  in CNF:
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_2
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_1
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_0
c  in DIMACS:
 10967  10968 -10969  972 -10970 0
 10967  10968 -10969  972 -10971 0
 10967  10968 -10969  972 -10972 0

c  0-1 --> -1
c    (-b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧ -p_972) -> ( b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0)
c  in CNF:
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨  b^{9, 109}_2
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_1
c     b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨  b^{9, 109}_0
c  in DIMACS:
 10967  10968  10969  972  10970 0
 10967  10968  10969  972 -10971 0
 10967  10968  10969  972  10972 0

c  -1-1 --> -2
c    ( b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧  b^{9, 108}_0 ∧ -p_972) -> ( b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0)
c  in CNF:
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨  b^{9, 109}_2
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨  b^{9, 109}_1
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨  p_972 ∨ -b^{9, 109}_0
c  in DIMACS:
-10967  10968 -10969  972  10970 0
-10967  10968 -10969  972  10971 0
-10967  10968 -10969  972 -10972 0

c  -2-1 --> break 
c    ( b^{9, 108}_2 ∧  b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨  b^{9, 108}_0 ∨  p_972 ∨ break
c  in DIMACS:
-10967 -10968  10969  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 108}_2 ∧ -b^{9, 108}_1 ∧ -b^{9, 108}_0 ∧ true) 
c  in CNF:
c    -b^{9, 108}_2 ∨  b^{9, 108}_1 ∨  b^{9, 108}_0 ∨ false 
c  in DIMACS:
-10967  10968  10969  0

c  3 does not represent an automaton state.
c    -(-b^{9, 108}_2 ∧  b^{9, 108}_1 ∧  b^{9, 108}_0 ∧ true) 
c  in CNF:
c     b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ false 
c  in DIMACS:
 10967 -10968 -10969  0
c  -3 does not represent an automaton state.
c    -( b^{9, 108}_2 ∧  b^{9, 108}_1 ∧  b^{9, 108}_0 ∧ true) 
c  in CNF:
c    -b^{9, 108}_2 ∨ -b^{9, 108}_1 ∨ -b^{9, 108}_0 ∨ false 
c  in DIMACS:
-10967 -10968 -10969  0

c i = 109
c  -2+1 --> -1
c    ( b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧  p_981) -> ( b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0)
c  in CNF:
c    -b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨  b^{9, 110}_2
c    -b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_1
c    -b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨  b^{9, 110}_0
c  in DIMACS:
-10970 -10971  10972 -981  10973 0
-10970 -10971  10972 -981 -10974 0
-10970 -10971  10972 -981  10975 0

c  -1+1 --> 0
c    ( b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0 ∧  p_981) -> (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧ -b^{9, 110}_0)
c  in CNF:
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_2
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_1
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_0
c  in DIMACS:
-10970  10971 -10972 -981 -10973 0
-10970  10971 -10972 -981 -10974 0
-10970  10971 -10972 -981 -10975 0

c  0+1 --> 1
c    (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧  p_981) -> (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0)
c  in CNF:
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_2
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_1
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨  b^{9, 110}_0
c  in DIMACS:
 10970  10971  10972 -981 -10973 0
 10970  10971  10972 -981 -10974 0
 10970  10971  10972 -981  10975 0

c  1+1 --> 2
c    (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0 ∧  p_981) -> (-b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0)
c  in CNF:
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_2
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨  b^{9, 110}_1
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ -p_981 ∨ -b^{9, 110}_0
c  in DIMACS:
 10970  10971 -10972 -981 -10973 0
 10970  10971 -10972 -981  10974 0
 10970  10971 -10972 -981 -10975 0

c  2+1 --> break 
c    (-b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧  p_981) -> break
c  in CNF:
c     b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ -p_981 ∨ break
c  in DIMACS:
 10970 -10971  10972 -981 1162 0


c  2-1 --> 1
c    (-b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧ -p_981) -> (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0)
c  in CNF:
c     b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_2
c     b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_1
c     b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨  b^{9, 110}_0
c  in DIMACS:
 10970 -10971  10972  981 -10973 0
 10970 -10971  10972  981 -10974 0
 10970 -10971  10972  981  10975 0

c  1-1 --> 0
c    (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0 ∧ -p_981) -> (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧ -b^{9, 110}_0)
c  in CNF:
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_2
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_1
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_0
c  in DIMACS:
 10970  10971 -10972  981 -10973 0
 10970  10971 -10972  981 -10974 0
 10970  10971 -10972  981 -10975 0

c  0-1 --> -1
c    (-b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧ -p_981) -> ( b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0)
c  in CNF:
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨  b^{9, 110}_2
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_1
c     b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨  b^{9, 110}_0
c  in DIMACS:
 10970  10971  10972  981  10973 0
 10970  10971  10972  981 -10974 0
 10970  10971  10972  981  10975 0

c  -1-1 --> -2
c    ( b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧  b^{9, 109}_0 ∧ -p_981) -> ( b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0)
c  in CNF:
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨  b^{9, 110}_2
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨  b^{9, 110}_1
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨  p_981 ∨ -b^{9, 110}_0
c  in DIMACS:
-10970  10971 -10972  981  10973 0
-10970  10971 -10972  981  10974 0
-10970  10971 -10972  981 -10975 0

c  -2-1 --> break 
c    ( b^{9, 109}_2 ∧  b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧ -p_981) -> break
c  in CNF:
c    -b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨  b^{9, 109}_0 ∨  p_981 ∨ break
c  in DIMACS:
-10970 -10971  10972  981 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 109}_2 ∧ -b^{9, 109}_1 ∧ -b^{9, 109}_0 ∧ true) 
c  in CNF:
c    -b^{9, 109}_2 ∨  b^{9, 109}_1 ∨  b^{9, 109}_0 ∨ false 
c  in DIMACS:
-10970  10971  10972  0

c  3 does not represent an automaton state.
c    -(-b^{9, 109}_2 ∧  b^{9, 109}_1 ∧  b^{9, 109}_0 ∧ true) 
c  in CNF:
c     b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ false 
c  in DIMACS:
 10970 -10971 -10972  0
c  -3 does not represent an automaton state.
c    -( b^{9, 109}_2 ∧  b^{9, 109}_1 ∧  b^{9, 109}_0 ∧ true) 
c  in CNF:
c    -b^{9, 109}_2 ∨ -b^{9, 109}_1 ∨ -b^{9, 109}_0 ∨ false 
c  in DIMACS:
-10970 -10971 -10972  0

c i = 110
c  -2+1 --> -1
c    ( b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧  p_990) -> ( b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0)
c  in CNF:
c    -b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨  b^{9, 111}_2
c    -b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_1
c    -b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨  b^{9, 111}_0
c  in DIMACS:
-10973 -10974  10975 -990  10976 0
-10973 -10974  10975 -990 -10977 0
-10973 -10974  10975 -990  10978 0

c  -1+1 --> 0
c    ( b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0 ∧  p_990) -> (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧ -b^{9, 111}_0)
c  in CNF:
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_2
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_1
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_0
c  in DIMACS:
-10973  10974 -10975 -990 -10976 0
-10973  10974 -10975 -990 -10977 0
-10973  10974 -10975 -990 -10978 0

c  0+1 --> 1
c    (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧  p_990) -> (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0)
c  in CNF:
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_2
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_1
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨  b^{9, 111}_0
c  in DIMACS:
 10973  10974  10975 -990 -10976 0
 10973  10974  10975 -990 -10977 0
 10973  10974  10975 -990  10978 0

c  1+1 --> 2
c    (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0 ∧  p_990) -> (-b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0)
c  in CNF:
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_2
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨  b^{9, 111}_1
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ -p_990 ∨ -b^{9, 111}_0
c  in DIMACS:
 10973  10974 -10975 -990 -10976 0
 10973  10974 -10975 -990  10977 0
 10973  10974 -10975 -990 -10978 0

c  2+1 --> break 
c    (-b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧  p_990) -> break
c  in CNF:
c     b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 10973 -10974  10975 -990 1162 0


c  2-1 --> 1
c    (-b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧ -p_990) -> (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0)
c  in CNF:
c     b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_2
c     b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_1
c     b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨  b^{9, 111}_0
c  in DIMACS:
 10973 -10974  10975  990 -10976 0
 10973 -10974  10975  990 -10977 0
 10973 -10974  10975  990  10978 0

c  1-1 --> 0
c    (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0 ∧ -p_990) -> (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧ -b^{9, 111}_0)
c  in CNF:
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_2
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_1
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_0
c  in DIMACS:
 10973  10974 -10975  990 -10976 0
 10973  10974 -10975  990 -10977 0
 10973  10974 -10975  990 -10978 0

c  0-1 --> -1
c    (-b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧ -p_990) -> ( b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0)
c  in CNF:
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨  b^{9, 111}_2
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_1
c     b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨  b^{9, 111}_0
c  in DIMACS:
 10973  10974  10975  990  10976 0
 10973  10974  10975  990 -10977 0
 10973  10974  10975  990  10978 0

c  -1-1 --> -2
c    ( b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧  b^{9, 110}_0 ∧ -p_990) -> ( b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0)
c  in CNF:
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨  b^{9, 111}_2
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨  b^{9, 111}_1
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨  p_990 ∨ -b^{9, 111}_0
c  in DIMACS:
-10973  10974 -10975  990  10976 0
-10973  10974 -10975  990  10977 0
-10973  10974 -10975  990 -10978 0

c  -2-1 --> break 
c    ( b^{9, 110}_2 ∧  b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨  b^{9, 110}_0 ∨  p_990 ∨ break
c  in DIMACS:
-10973 -10974  10975  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 110}_2 ∧ -b^{9, 110}_1 ∧ -b^{9, 110}_0 ∧ true) 
c  in CNF:
c    -b^{9, 110}_2 ∨  b^{9, 110}_1 ∨  b^{9, 110}_0 ∨ false 
c  in DIMACS:
-10973  10974  10975  0

c  3 does not represent an automaton state.
c    -(-b^{9, 110}_2 ∧  b^{9, 110}_1 ∧  b^{9, 110}_0 ∧ true) 
c  in CNF:
c     b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ false 
c  in DIMACS:
 10973 -10974 -10975  0
c  -3 does not represent an automaton state.
c    -( b^{9, 110}_2 ∧  b^{9, 110}_1 ∧  b^{9, 110}_0 ∧ true) 
c  in CNF:
c    -b^{9, 110}_2 ∨ -b^{9, 110}_1 ∨ -b^{9, 110}_0 ∨ false 
c  in DIMACS:
-10973 -10974 -10975  0

c i = 111
c  -2+1 --> -1
c    ( b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧  p_999) -> ( b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0)
c  in CNF:
c    -b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨  b^{9, 112}_2
c    -b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_1
c    -b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨  b^{9, 112}_0
c  in DIMACS:
-10976 -10977  10978 -999  10979 0
-10976 -10977  10978 -999 -10980 0
-10976 -10977  10978 -999  10981 0

c  -1+1 --> 0
c    ( b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0 ∧  p_999) -> (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧ -b^{9, 112}_0)
c  in CNF:
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_2
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_1
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_0
c  in DIMACS:
-10976  10977 -10978 -999 -10979 0
-10976  10977 -10978 -999 -10980 0
-10976  10977 -10978 -999 -10981 0

c  0+1 --> 1
c    (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧  p_999) -> (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0)
c  in CNF:
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_2
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_1
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨  b^{9, 112}_0
c  in DIMACS:
 10976  10977  10978 -999 -10979 0
 10976  10977  10978 -999 -10980 0
 10976  10977  10978 -999  10981 0

c  1+1 --> 2
c    (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0 ∧  p_999) -> (-b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0)
c  in CNF:
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_2
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨  b^{9, 112}_1
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ -p_999 ∨ -b^{9, 112}_0
c  in DIMACS:
 10976  10977 -10978 -999 -10979 0
 10976  10977 -10978 -999  10980 0
 10976  10977 -10978 -999 -10981 0

c  2+1 --> break 
c    (-b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧  p_999) -> break
c  in CNF:
c     b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 10976 -10977  10978 -999 1162 0


c  2-1 --> 1
c    (-b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧ -p_999) -> (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0)
c  in CNF:
c     b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_2
c     b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_1
c     b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨  b^{9, 112}_0
c  in DIMACS:
 10976 -10977  10978  999 -10979 0
 10976 -10977  10978  999 -10980 0
 10976 -10977  10978  999  10981 0

c  1-1 --> 0
c    (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0 ∧ -p_999) -> (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧ -b^{9, 112}_0)
c  in CNF:
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_2
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_1
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_0
c  in DIMACS:
 10976  10977 -10978  999 -10979 0
 10976  10977 -10978  999 -10980 0
 10976  10977 -10978  999 -10981 0

c  0-1 --> -1
c    (-b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧ -p_999) -> ( b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0)
c  in CNF:
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨  b^{9, 112}_2
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_1
c     b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨  b^{9, 112}_0
c  in DIMACS:
 10976  10977  10978  999  10979 0
 10976  10977  10978  999 -10980 0
 10976  10977  10978  999  10981 0

c  -1-1 --> -2
c    ( b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧  b^{9, 111}_0 ∧ -p_999) -> ( b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0)
c  in CNF:
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨  b^{9, 112}_2
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨  b^{9, 112}_1
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨  p_999 ∨ -b^{9, 112}_0
c  in DIMACS:
-10976  10977 -10978  999  10979 0
-10976  10977 -10978  999  10980 0
-10976  10977 -10978  999 -10981 0

c  -2-1 --> break 
c    ( b^{9, 111}_2 ∧  b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨  b^{9, 111}_0 ∨  p_999 ∨ break
c  in DIMACS:
-10976 -10977  10978  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 111}_2 ∧ -b^{9, 111}_1 ∧ -b^{9, 111}_0 ∧ true) 
c  in CNF:
c    -b^{9, 111}_2 ∨  b^{9, 111}_1 ∨  b^{9, 111}_0 ∨ false 
c  in DIMACS:
-10976  10977  10978  0

c  3 does not represent an automaton state.
c    -(-b^{9, 111}_2 ∧  b^{9, 111}_1 ∧  b^{9, 111}_0 ∧ true) 
c  in CNF:
c     b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ false 
c  in DIMACS:
 10976 -10977 -10978  0
c  -3 does not represent an automaton state.
c    -( b^{9, 111}_2 ∧  b^{9, 111}_1 ∧  b^{9, 111}_0 ∧ true) 
c  in CNF:
c    -b^{9, 111}_2 ∨ -b^{9, 111}_1 ∨ -b^{9, 111}_0 ∨ false 
c  in DIMACS:
-10976 -10977 -10978  0

c i = 112
c  -2+1 --> -1
c    ( b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧  p_1008) -> ( b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0)
c  in CNF:
c    -b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨  b^{9, 113}_2
c    -b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_1
c    -b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨  b^{9, 113}_0
c  in DIMACS:
-10979 -10980  10981 -1008  10982 0
-10979 -10980  10981 -1008 -10983 0
-10979 -10980  10981 -1008  10984 0

c  -1+1 --> 0
c    ( b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0 ∧  p_1008) -> (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧ -b^{9, 113}_0)
c  in CNF:
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_2
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_1
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_0
c  in DIMACS:
-10979  10980 -10981 -1008 -10982 0
-10979  10980 -10981 -1008 -10983 0
-10979  10980 -10981 -1008 -10984 0

c  0+1 --> 1
c    (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧  p_1008) -> (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0)
c  in CNF:
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_2
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_1
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨  b^{9, 113}_0
c  in DIMACS:
 10979  10980  10981 -1008 -10982 0
 10979  10980  10981 -1008 -10983 0
 10979  10980  10981 -1008  10984 0

c  1+1 --> 2
c    (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0 ∧  p_1008) -> (-b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0)
c  in CNF:
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_2
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨  b^{9, 113}_1
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ -p_1008 ∨ -b^{9, 113}_0
c  in DIMACS:
 10979  10980 -10981 -1008 -10982 0
 10979  10980 -10981 -1008  10983 0
 10979  10980 -10981 -1008 -10984 0

c  2+1 --> break 
c    (-b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 10979 -10980  10981 -1008 1162 0


c  2-1 --> 1
c    (-b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧ -p_1008) -> (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0)
c  in CNF:
c     b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_2
c     b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_1
c     b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨  b^{9, 113}_0
c  in DIMACS:
 10979 -10980  10981  1008 -10982 0
 10979 -10980  10981  1008 -10983 0
 10979 -10980  10981  1008  10984 0

c  1-1 --> 0
c    (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0 ∧ -p_1008) -> (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧ -b^{9, 113}_0)
c  in CNF:
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_2
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_1
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_0
c  in DIMACS:
 10979  10980 -10981  1008 -10982 0
 10979  10980 -10981  1008 -10983 0
 10979  10980 -10981  1008 -10984 0

c  0-1 --> -1
c    (-b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧ -p_1008) -> ( b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0)
c  in CNF:
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨  b^{9, 113}_2
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_1
c     b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨  b^{9, 113}_0
c  in DIMACS:
 10979  10980  10981  1008  10982 0
 10979  10980  10981  1008 -10983 0
 10979  10980  10981  1008  10984 0

c  -1-1 --> -2
c    ( b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧  b^{9, 112}_0 ∧ -p_1008) -> ( b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0)
c  in CNF:
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨  b^{9, 113}_2
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨  b^{9, 113}_1
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨  p_1008 ∨ -b^{9, 113}_0
c  in DIMACS:
-10979  10980 -10981  1008  10982 0
-10979  10980 -10981  1008  10983 0
-10979  10980 -10981  1008 -10984 0

c  -2-1 --> break 
c    ( b^{9, 112}_2 ∧  b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨  b^{9, 112}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-10979 -10980  10981  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 112}_2 ∧ -b^{9, 112}_1 ∧ -b^{9, 112}_0 ∧ true) 
c  in CNF:
c    -b^{9, 112}_2 ∨  b^{9, 112}_1 ∨  b^{9, 112}_0 ∨ false 
c  in DIMACS:
-10979  10980  10981  0

c  3 does not represent an automaton state.
c    -(-b^{9, 112}_2 ∧  b^{9, 112}_1 ∧  b^{9, 112}_0 ∧ true) 
c  in CNF:
c     b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ false 
c  in DIMACS:
 10979 -10980 -10981  0
c  -3 does not represent an automaton state.
c    -( b^{9, 112}_2 ∧  b^{9, 112}_1 ∧  b^{9, 112}_0 ∧ true) 
c  in CNF:
c    -b^{9, 112}_2 ∨ -b^{9, 112}_1 ∨ -b^{9, 112}_0 ∨ false 
c  in DIMACS:
-10979 -10980 -10981  0

c i = 113
c  -2+1 --> -1
c    ( b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧  p_1017) -> ( b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0)
c  in CNF:
c    -b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨  b^{9, 114}_2
c    -b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_1
c    -b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨  b^{9, 114}_0
c  in DIMACS:
-10982 -10983  10984 -1017  10985 0
-10982 -10983  10984 -1017 -10986 0
-10982 -10983  10984 -1017  10987 0

c  -1+1 --> 0
c    ( b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0 ∧  p_1017) -> (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧ -b^{9, 114}_0)
c  in CNF:
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_2
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_1
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_0
c  in DIMACS:
-10982  10983 -10984 -1017 -10985 0
-10982  10983 -10984 -1017 -10986 0
-10982  10983 -10984 -1017 -10987 0

c  0+1 --> 1
c    (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧  p_1017) -> (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0)
c  in CNF:
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_2
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_1
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨  b^{9, 114}_0
c  in DIMACS:
 10982  10983  10984 -1017 -10985 0
 10982  10983  10984 -1017 -10986 0
 10982  10983  10984 -1017  10987 0

c  1+1 --> 2
c    (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0 ∧  p_1017) -> (-b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0)
c  in CNF:
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_2
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨  b^{9, 114}_1
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ -p_1017 ∨ -b^{9, 114}_0
c  in DIMACS:
 10982  10983 -10984 -1017 -10985 0
 10982  10983 -10984 -1017  10986 0
 10982  10983 -10984 -1017 -10987 0

c  2+1 --> break 
c    (-b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧  p_1017) -> break
c  in CNF:
c     b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ -p_1017 ∨ break
c  in DIMACS:
 10982 -10983  10984 -1017 1162 0


c  2-1 --> 1
c    (-b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧ -p_1017) -> (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0)
c  in CNF:
c     b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_2
c     b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_1
c     b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨  b^{9, 114}_0
c  in DIMACS:
 10982 -10983  10984  1017 -10985 0
 10982 -10983  10984  1017 -10986 0
 10982 -10983  10984  1017  10987 0

c  1-1 --> 0
c    (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0 ∧ -p_1017) -> (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧ -b^{9, 114}_0)
c  in CNF:
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_2
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_1
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_0
c  in DIMACS:
 10982  10983 -10984  1017 -10985 0
 10982  10983 -10984  1017 -10986 0
 10982  10983 -10984  1017 -10987 0

c  0-1 --> -1
c    (-b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧ -p_1017) -> ( b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0)
c  in CNF:
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨  b^{9, 114}_2
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_1
c     b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨  b^{9, 114}_0
c  in DIMACS:
 10982  10983  10984  1017  10985 0
 10982  10983  10984  1017 -10986 0
 10982  10983  10984  1017  10987 0

c  -1-1 --> -2
c    ( b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧  b^{9, 113}_0 ∧ -p_1017) -> ( b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0)
c  in CNF:
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨  b^{9, 114}_2
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨  b^{9, 114}_1
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨  p_1017 ∨ -b^{9, 114}_0
c  in DIMACS:
-10982  10983 -10984  1017  10985 0
-10982  10983 -10984  1017  10986 0
-10982  10983 -10984  1017 -10987 0

c  -2-1 --> break 
c    ( b^{9, 113}_2 ∧  b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧ -p_1017) -> break
c  in CNF:
c    -b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨  b^{9, 113}_0 ∨  p_1017 ∨ break
c  in DIMACS:
-10982 -10983  10984  1017 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 113}_2 ∧ -b^{9, 113}_1 ∧ -b^{9, 113}_0 ∧ true) 
c  in CNF:
c    -b^{9, 113}_2 ∨  b^{9, 113}_1 ∨  b^{9, 113}_0 ∨ false 
c  in DIMACS:
-10982  10983  10984  0

c  3 does not represent an automaton state.
c    -(-b^{9, 113}_2 ∧  b^{9, 113}_1 ∧  b^{9, 113}_0 ∧ true) 
c  in CNF:
c     b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ false 
c  in DIMACS:
 10982 -10983 -10984  0
c  -3 does not represent an automaton state.
c    -( b^{9, 113}_2 ∧  b^{9, 113}_1 ∧  b^{9, 113}_0 ∧ true) 
c  in CNF:
c    -b^{9, 113}_2 ∨ -b^{9, 113}_1 ∨ -b^{9, 113}_0 ∨ false 
c  in DIMACS:
-10982 -10983 -10984  0

c i = 114
c  -2+1 --> -1
c    ( b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧  p_1026) -> ( b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0)
c  in CNF:
c    -b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨  b^{9, 115}_2
c    -b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_1
c    -b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨  b^{9, 115}_0
c  in DIMACS:
-10985 -10986  10987 -1026  10988 0
-10985 -10986  10987 -1026 -10989 0
-10985 -10986  10987 -1026  10990 0

c  -1+1 --> 0
c    ( b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0 ∧  p_1026) -> (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧ -b^{9, 115}_0)
c  in CNF:
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_2
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_1
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_0
c  in DIMACS:
-10985  10986 -10987 -1026 -10988 0
-10985  10986 -10987 -1026 -10989 0
-10985  10986 -10987 -1026 -10990 0

c  0+1 --> 1
c    (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧  p_1026) -> (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0)
c  in CNF:
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_2
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_1
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨  b^{9, 115}_0
c  in DIMACS:
 10985  10986  10987 -1026 -10988 0
 10985  10986  10987 -1026 -10989 0
 10985  10986  10987 -1026  10990 0

c  1+1 --> 2
c    (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0 ∧  p_1026) -> (-b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0)
c  in CNF:
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_2
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨  b^{9, 115}_1
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ -p_1026 ∨ -b^{9, 115}_0
c  in DIMACS:
 10985  10986 -10987 -1026 -10988 0
 10985  10986 -10987 -1026  10989 0
 10985  10986 -10987 -1026 -10990 0

c  2+1 --> break 
c    (-b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 10985 -10986  10987 -1026 1162 0


c  2-1 --> 1
c    (-b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧ -p_1026) -> (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0)
c  in CNF:
c     b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_2
c     b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_1
c     b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨  b^{9, 115}_0
c  in DIMACS:
 10985 -10986  10987  1026 -10988 0
 10985 -10986  10987  1026 -10989 0
 10985 -10986  10987  1026  10990 0

c  1-1 --> 0
c    (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0 ∧ -p_1026) -> (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧ -b^{9, 115}_0)
c  in CNF:
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_2
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_1
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_0
c  in DIMACS:
 10985  10986 -10987  1026 -10988 0
 10985  10986 -10987  1026 -10989 0
 10985  10986 -10987  1026 -10990 0

c  0-1 --> -1
c    (-b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧ -p_1026) -> ( b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0)
c  in CNF:
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨  b^{9, 115}_2
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_1
c     b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨  b^{9, 115}_0
c  in DIMACS:
 10985  10986  10987  1026  10988 0
 10985  10986  10987  1026 -10989 0
 10985  10986  10987  1026  10990 0

c  -1-1 --> -2
c    ( b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧  b^{9, 114}_0 ∧ -p_1026) -> ( b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0)
c  in CNF:
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨  b^{9, 115}_2
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨  b^{9, 115}_1
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨  p_1026 ∨ -b^{9, 115}_0
c  in DIMACS:
-10985  10986 -10987  1026  10988 0
-10985  10986 -10987  1026  10989 0
-10985  10986 -10987  1026 -10990 0

c  -2-1 --> break 
c    ( b^{9, 114}_2 ∧  b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨  b^{9, 114}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-10985 -10986  10987  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 114}_2 ∧ -b^{9, 114}_1 ∧ -b^{9, 114}_0 ∧ true) 
c  in CNF:
c    -b^{9, 114}_2 ∨  b^{9, 114}_1 ∨  b^{9, 114}_0 ∨ false 
c  in DIMACS:
-10985  10986  10987  0

c  3 does not represent an automaton state.
c    -(-b^{9, 114}_2 ∧  b^{9, 114}_1 ∧  b^{9, 114}_0 ∧ true) 
c  in CNF:
c     b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ false 
c  in DIMACS:
 10985 -10986 -10987  0
c  -3 does not represent an automaton state.
c    -( b^{9, 114}_2 ∧  b^{9, 114}_1 ∧  b^{9, 114}_0 ∧ true) 
c  in CNF:
c    -b^{9, 114}_2 ∨ -b^{9, 114}_1 ∨ -b^{9, 114}_0 ∨ false 
c  in DIMACS:
-10985 -10986 -10987  0

c i = 115
c  -2+1 --> -1
c    ( b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧  p_1035) -> ( b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0)
c  in CNF:
c    -b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨  b^{9, 116}_2
c    -b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_1
c    -b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨  b^{9, 116}_0
c  in DIMACS:
-10988 -10989  10990 -1035  10991 0
-10988 -10989  10990 -1035 -10992 0
-10988 -10989  10990 -1035  10993 0

c  -1+1 --> 0
c    ( b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0 ∧  p_1035) -> (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧ -b^{9, 116}_0)
c  in CNF:
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_2
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_1
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_0
c  in DIMACS:
-10988  10989 -10990 -1035 -10991 0
-10988  10989 -10990 -1035 -10992 0
-10988  10989 -10990 -1035 -10993 0

c  0+1 --> 1
c    (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧  p_1035) -> (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0)
c  in CNF:
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_2
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_1
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨  b^{9, 116}_0
c  in DIMACS:
 10988  10989  10990 -1035 -10991 0
 10988  10989  10990 -1035 -10992 0
 10988  10989  10990 -1035  10993 0

c  1+1 --> 2
c    (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0 ∧  p_1035) -> (-b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0)
c  in CNF:
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_2
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨  b^{9, 116}_1
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ -p_1035 ∨ -b^{9, 116}_0
c  in DIMACS:
 10988  10989 -10990 -1035 -10991 0
 10988  10989 -10990 -1035  10992 0
 10988  10989 -10990 -1035 -10993 0

c  2+1 --> break 
c    (-b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 10988 -10989  10990 -1035 1162 0


c  2-1 --> 1
c    (-b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧ -p_1035) -> (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0)
c  in CNF:
c     b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_2
c     b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_1
c     b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨  b^{9, 116}_0
c  in DIMACS:
 10988 -10989  10990  1035 -10991 0
 10988 -10989  10990  1035 -10992 0
 10988 -10989  10990  1035  10993 0

c  1-1 --> 0
c    (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0 ∧ -p_1035) -> (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧ -b^{9, 116}_0)
c  in CNF:
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_2
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_1
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_0
c  in DIMACS:
 10988  10989 -10990  1035 -10991 0
 10988  10989 -10990  1035 -10992 0
 10988  10989 -10990  1035 -10993 0

c  0-1 --> -1
c    (-b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧ -p_1035) -> ( b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0)
c  in CNF:
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨  b^{9, 116}_2
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_1
c     b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨  b^{9, 116}_0
c  in DIMACS:
 10988  10989  10990  1035  10991 0
 10988  10989  10990  1035 -10992 0
 10988  10989  10990  1035  10993 0

c  -1-1 --> -2
c    ( b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧  b^{9, 115}_0 ∧ -p_1035) -> ( b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0)
c  in CNF:
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨  b^{9, 116}_2
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨  b^{9, 116}_1
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨  p_1035 ∨ -b^{9, 116}_0
c  in DIMACS:
-10988  10989 -10990  1035  10991 0
-10988  10989 -10990  1035  10992 0
-10988  10989 -10990  1035 -10993 0

c  -2-1 --> break 
c    ( b^{9, 115}_2 ∧  b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨  b^{9, 115}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-10988 -10989  10990  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 115}_2 ∧ -b^{9, 115}_1 ∧ -b^{9, 115}_0 ∧ true) 
c  in CNF:
c    -b^{9, 115}_2 ∨  b^{9, 115}_1 ∨  b^{9, 115}_0 ∨ false 
c  in DIMACS:
-10988  10989  10990  0

c  3 does not represent an automaton state.
c    -(-b^{9, 115}_2 ∧  b^{9, 115}_1 ∧  b^{9, 115}_0 ∧ true) 
c  in CNF:
c     b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ false 
c  in DIMACS:
 10988 -10989 -10990  0
c  -3 does not represent an automaton state.
c    -( b^{9, 115}_2 ∧  b^{9, 115}_1 ∧  b^{9, 115}_0 ∧ true) 
c  in CNF:
c    -b^{9, 115}_2 ∨ -b^{9, 115}_1 ∨ -b^{9, 115}_0 ∨ false 
c  in DIMACS:
-10988 -10989 -10990  0

c i = 116
c  -2+1 --> -1
c    ( b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧  p_1044) -> ( b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0)
c  in CNF:
c    -b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨  b^{9, 117}_2
c    -b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_1
c    -b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨  b^{9, 117}_0
c  in DIMACS:
-10991 -10992  10993 -1044  10994 0
-10991 -10992  10993 -1044 -10995 0
-10991 -10992  10993 -1044  10996 0

c  -1+1 --> 0
c    ( b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0 ∧  p_1044) -> (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧ -b^{9, 117}_0)
c  in CNF:
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_2
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_1
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_0
c  in DIMACS:
-10991  10992 -10993 -1044 -10994 0
-10991  10992 -10993 -1044 -10995 0
-10991  10992 -10993 -1044 -10996 0

c  0+1 --> 1
c    (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧  p_1044) -> (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0)
c  in CNF:
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_2
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_1
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨  b^{9, 117}_0
c  in DIMACS:
 10991  10992  10993 -1044 -10994 0
 10991  10992  10993 -1044 -10995 0
 10991  10992  10993 -1044  10996 0

c  1+1 --> 2
c    (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0 ∧  p_1044) -> (-b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0)
c  in CNF:
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_2
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨  b^{9, 117}_1
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ -p_1044 ∨ -b^{9, 117}_0
c  in DIMACS:
 10991  10992 -10993 -1044 -10994 0
 10991  10992 -10993 -1044  10995 0
 10991  10992 -10993 -1044 -10996 0

c  2+1 --> break 
c    (-b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 10991 -10992  10993 -1044 1162 0


c  2-1 --> 1
c    (-b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧ -p_1044) -> (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0)
c  in CNF:
c     b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_2
c     b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_1
c     b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨  b^{9, 117}_0
c  in DIMACS:
 10991 -10992  10993  1044 -10994 0
 10991 -10992  10993  1044 -10995 0
 10991 -10992  10993  1044  10996 0

c  1-1 --> 0
c    (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0 ∧ -p_1044) -> (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧ -b^{9, 117}_0)
c  in CNF:
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_2
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_1
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_0
c  in DIMACS:
 10991  10992 -10993  1044 -10994 0
 10991  10992 -10993  1044 -10995 0
 10991  10992 -10993  1044 -10996 0

c  0-1 --> -1
c    (-b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧ -p_1044) -> ( b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0)
c  in CNF:
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨  b^{9, 117}_2
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_1
c     b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨  b^{9, 117}_0
c  in DIMACS:
 10991  10992  10993  1044  10994 0
 10991  10992  10993  1044 -10995 0
 10991  10992  10993  1044  10996 0

c  -1-1 --> -2
c    ( b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧  b^{9, 116}_0 ∧ -p_1044) -> ( b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0)
c  in CNF:
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨  b^{9, 117}_2
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨  b^{9, 117}_1
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨  p_1044 ∨ -b^{9, 117}_0
c  in DIMACS:
-10991  10992 -10993  1044  10994 0
-10991  10992 -10993  1044  10995 0
-10991  10992 -10993  1044 -10996 0

c  -2-1 --> break 
c    ( b^{9, 116}_2 ∧  b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨  b^{9, 116}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-10991 -10992  10993  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 116}_2 ∧ -b^{9, 116}_1 ∧ -b^{9, 116}_0 ∧ true) 
c  in CNF:
c    -b^{9, 116}_2 ∨  b^{9, 116}_1 ∨  b^{9, 116}_0 ∨ false 
c  in DIMACS:
-10991  10992  10993  0

c  3 does not represent an automaton state.
c    -(-b^{9, 116}_2 ∧  b^{9, 116}_1 ∧  b^{9, 116}_0 ∧ true) 
c  in CNF:
c     b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ false 
c  in DIMACS:
 10991 -10992 -10993  0
c  -3 does not represent an automaton state.
c    -( b^{9, 116}_2 ∧  b^{9, 116}_1 ∧  b^{9, 116}_0 ∧ true) 
c  in CNF:
c    -b^{9, 116}_2 ∨ -b^{9, 116}_1 ∨ -b^{9, 116}_0 ∨ false 
c  in DIMACS:
-10991 -10992 -10993  0

c i = 117
c  -2+1 --> -1
c    ( b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧  p_1053) -> ( b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0)
c  in CNF:
c    -b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨  b^{9, 118}_2
c    -b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_1
c    -b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨  b^{9, 118}_0
c  in DIMACS:
-10994 -10995  10996 -1053  10997 0
-10994 -10995  10996 -1053 -10998 0
-10994 -10995  10996 -1053  10999 0

c  -1+1 --> 0
c    ( b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0 ∧  p_1053) -> (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧ -b^{9, 118}_0)
c  in CNF:
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_2
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_1
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_0
c  in DIMACS:
-10994  10995 -10996 -1053 -10997 0
-10994  10995 -10996 -1053 -10998 0
-10994  10995 -10996 -1053 -10999 0

c  0+1 --> 1
c    (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧  p_1053) -> (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0)
c  in CNF:
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_2
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_1
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨  b^{9, 118}_0
c  in DIMACS:
 10994  10995  10996 -1053 -10997 0
 10994  10995  10996 -1053 -10998 0
 10994  10995  10996 -1053  10999 0

c  1+1 --> 2
c    (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0 ∧  p_1053) -> (-b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0)
c  in CNF:
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_2
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨  b^{9, 118}_1
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ -p_1053 ∨ -b^{9, 118}_0
c  in DIMACS:
 10994  10995 -10996 -1053 -10997 0
 10994  10995 -10996 -1053  10998 0
 10994  10995 -10996 -1053 -10999 0

c  2+1 --> break 
c    (-b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 10994 -10995  10996 -1053 1162 0


c  2-1 --> 1
c    (-b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧ -p_1053) -> (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0)
c  in CNF:
c     b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_2
c     b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_1
c     b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨  b^{9, 118}_0
c  in DIMACS:
 10994 -10995  10996  1053 -10997 0
 10994 -10995  10996  1053 -10998 0
 10994 -10995  10996  1053  10999 0

c  1-1 --> 0
c    (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0 ∧ -p_1053) -> (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧ -b^{9, 118}_0)
c  in CNF:
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_2
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_1
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_0
c  in DIMACS:
 10994  10995 -10996  1053 -10997 0
 10994  10995 -10996  1053 -10998 0
 10994  10995 -10996  1053 -10999 0

c  0-1 --> -1
c    (-b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧ -p_1053) -> ( b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0)
c  in CNF:
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨  b^{9, 118}_2
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_1
c     b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨  b^{9, 118}_0
c  in DIMACS:
 10994  10995  10996  1053  10997 0
 10994  10995  10996  1053 -10998 0
 10994  10995  10996  1053  10999 0

c  -1-1 --> -2
c    ( b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧  b^{9, 117}_0 ∧ -p_1053) -> ( b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0)
c  in CNF:
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨  b^{9, 118}_2
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨  b^{9, 118}_1
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨  p_1053 ∨ -b^{9, 118}_0
c  in DIMACS:
-10994  10995 -10996  1053  10997 0
-10994  10995 -10996  1053  10998 0
-10994  10995 -10996  1053 -10999 0

c  -2-1 --> break 
c    ( b^{9, 117}_2 ∧  b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨  b^{9, 117}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-10994 -10995  10996  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 117}_2 ∧ -b^{9, 117}_1 ∧ -b^{9, 117}_0 ∧ true) 
c  in CNF:
c    -b^{9, 117}_2 ∨  b^{9, 117}_1 ∨  b^{9, 117}_0 ∨ false 
c  in DIMACS:
-10994  10995  10996  0

c  3 does not represent an automaton state.
c    -(-b^{9, 117}_2 ∧  b^{9, 117}_1 ∧  b^{9, 117}_0 ∧ true) 
c  in CNF:
c     b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ false 
c  in DIMACS:
 10994 -10995 -10996  0
c  -3 does not represent an automaton state.
c    -( b^{9, 117}_2 ∧  b^{9, 117}_1 ∧  b^{9, 117}_0 ∧ true) 
c  in CNF:
c    -b^{9, 117}_2 ∨ -b^{9, 117}_1 ∨ -b^{9, 117}_0 ∨ false 
c  in DIMACS:
-10994 -10995 -10996  0

c i = 118
c  -2+1 --> -1
c    ( b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧  p_1062) -> ( b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0)
c  in CNF:
c    -b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨  b^{9, 119}_2
c    -b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_1
c    -b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨  b^{9, 119}_0
c  in DIMACS:
-10997 -10998  10999 -1062  11000 0
-10997 -10998  10999 -1062 -11001 0
-10997 -10998  10999 -1062  11002 0

c  -1+1 --> 0
c    ( b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0 ∧  p_1062) -> (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧ -b^{9, 119}_0)
c  in CNF:
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_2
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_1
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_0
c  in DIMACS:
-10997  10998 -10999 -1062 -11000 0
-10997  10998 -10999 -1062 -11001 0
-10997  10998 -10999 -1062 -11002 0

c  0+1 --> 1
c    (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧  p_1062) -> (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0)
c  in CNF:
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_2
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_1
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨  b^{9, 119}_0
c  in DIMACS:
 10997  10998  10999 -1062 -11000 0
 10997  10998  10999 -1062 -11001 0
 10997  10998  10999 -1062  11002 0

c  1+1 --> 2
c    (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0 ∧  p_1062) -> (-b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0)
c  in CNF:
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_2
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨  b^{9, 119}_1
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ -p_1062 ∨ -b^{9, 119}_0
c  in DIMACS:
 10997  10998 -10999 -1062 -11000 0
 10997  10998 -10999 -1062  11001 0
 10997  10998 -10999 -1062 -11002 0

c  2+1 --> break 
c    (-b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 10997 -10998  10999 -1062 1162 0


c  2-1 --> 1
c    (-b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧ -p_1062) -> (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0)
c  in CNF:
c     b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_2
c     b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_1
c     b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨  b^{9, 119}_0
c  in DIMACS:
 10997 -10998  10999  1062 -11000 0
 10997 -10998  10999  1062 -11001 0
 10997 -10998  10999  1062  11002 0

c  1-1 --> 0
c    (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0 ∧ -p_1062) -> (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧ -b^{9, 119}_0)
c  in CNF:
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_2
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_1
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_0
c  in DIMACS:
 10997  10998 -10999  1062 -11000 0
 10997  10998 -10999  1062 -11001 0
 10997  10998 -10999  1062 -11002 0

c  0-1 --> -1
c    (-b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧ -p_1062) -> ( b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0)
c  in CNF:
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨  b^{9, 119}_2
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_1
c     b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨  b^{9, 119}_0
c  in DIMACS:
 10997  10998  10999  1062  11000 0
 10997  10998  10999  1062 -11001 0
 10997  10998  10999  1062  11002 0

c  -1-1 --> -2
c    ( b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧  b^{9, 118}_0 ∧ -p_1062) -> ( b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0)
c  in CNF:
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨  b^{9, 119}_2
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨  b^{9, 119}_1
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨  p_1062 ∨ -b^{9, 119}_0
c  in DIMACS:
-10997  10998 -10999  1062  11000 0
-10997  10998 -10999  1062  11001 0
-10997  10998 -10999  1062 -11002 0

c  -2-1 --> break 
c    ( b^{9, 118}_2 ∧  b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨  b^{9, 118}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-10997 -10998  10999  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 118}_2 ∧ -b^{9, 118}_1 ∧ -b^{9, 118}_0 ∧ true) 
c  in CNF:
c    -b^{9, 118}_2 ∨  b^{9, 118}_1 ∨  b^{9, 118}_0 ∨ false 
c  in DIMACS:
-10997  10998  10999  0

c  3 does not represent an automaton state.
c    -(-b^{9, 118}_2 ∧  b^{9, 118}_1 ∧  b^{9, 118}_0 ∧ true) 
c  in CNF:
c     b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ false 
c  in DIMACS:
 10997 -10998 -10999  0
c  -3 does not represent an automaton state.
c    -( b^{9, 118}_2 ∧  b^{9, 118}_1 ∧  b^{9, 118}_0 ∧ true) 
c  in CNF:
c    -b^{9, 118}_2 ∨ -b^{9, 118}_1 ∨ -b^{9, 118}_0 ∨ false 
c  in DIMACS:
-10997 -10998 -10999  0

c i = 119
c  -2+1 --> -1
c    ( b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧  p_1071) -> ( b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0)
c  in CNF:
c    -b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨  b^{9, 120}_2
c    -b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_1
c    -b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨  b^{9, 120}_0
c  in DIMACS:
-11000 -11001  11002 -1071  11003 0
-11000 -11001  11002 -1071 -11004 0
-11000 -11001  11002 -1071  11005 0

c  -1+1 --> 0
c    ( b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0 ∧  p_1071) -> (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧ -b^{9, 120}_0)
c  in CNF:
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_2
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_1
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_0
c  in DIMACS:
-11000  11001 -11002 -1071 -11003 0
-11000  11001 -11002 -1071 -11004 0
-11000  11001 -11002 -1071 -11005 0

c  0+1 --> 1
c    (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧  p_1071) -> (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0)
c  in CNF:
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_2
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_1
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨  b^{9, 120}_0
c  in DIMACS:
 11000  11001  11002 -1071 -11003 0
 11000  11001  11002 -1071 -11004 0
 11000  11001  11002 -1071  11005 0

c  1+1 --> 2
c    (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0 ∧  p_1071) -> (-b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0)
c  in CNF:
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_2
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨  b^{9, 120}_1
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ -p_1071 ∨ -b^{9, 120}_0
c  in DIMACS:
 11000  11001 -11002 -1071 -11003 0
 11000  11001 -11002 -1071  11004 0
 11000  11001 -11002 -1071 -11005 0

c  2+1 --> break 
c    (-b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 11000 -11001  11002 -1071 1162 0


c  2-1 --> 1
c    (-b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧ -p_1071) -> (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0)
c  in CNF:
c     b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_2
c     b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_1
c     b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨  b^{9, 120}_0
c  in DIMACS:
 11000 -11001  11002  1071 -11003 0
 11000 -11001  11002  1071 -11004 0
 11000 -11001  11002  1071  11005 0

c  1-1 --> 0
c    (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0 ∧ -p_1071) -> (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧ -b^{9, 120}_0)
c  in CNF:
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_2
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_1
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_0
c  in DIMACS:
 11000  11001 -11002  1071 -11003 0
 11000  11001 -11002  1071 -11004 0
 11000  11001 -11002  1071 -11005 0

c  0-1 --> -1
c    (-b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧ -p_1071) -> ( b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0)
c  in CNF:
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨  b^{9, 120}_2
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_1
c     b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨  b^{9, 120}_0
c  in DIMACS:
 11000  11001  11002  1071  11003 0
 11000  11001  11002  1071 -11004 0
 11000  11001  11002  1071  11005 0

c  -1-1 --> -2
c    ( b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧  b^{9, 119}_0 ∧ -p_1071) -> ( b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0)
c  in CNF:
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨  b^{9, 120}_2
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨  b^{9, 120}_1
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨  p_1071 ∨ -b^{9, 120}_0
c  in DIMACS:
-11000  11001 -11002  1071  11003 0
-11000  11001 -11002  1071  11004 0
-11000  11001 -11002  1071 -11005 0

c  -2-1 --> break 
c    ( b^{9, 119}_2 ∧  b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨  b^{9, 119}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-11000 -11001  11002  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 119}_2 ∧ -b^{9, 119}_1 ∧ -b^{9, 119}_0 ∧ true) 
c  in CNF:
c    -b^{9, 119}_2 ∨  b^{9, 119}_1 ∨  b^{9, 119}_0 ∨ false 
c  in DIMACS:
-11000  11001  11002  0

c  3 does not represent an automaton state.
c    -(-b^{9, 119}_2 ∧  b^{9, 119}_1 ∧  b^{9, 119}_0 ∧ true) 
c  in CNF:
c     b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ false 
c  in DIMACS:
 11000 -11001 -11002  0
c  -3 does not represent an automaton state.
c    -( b^{9, 119}_2 ∧  b^{9, 119}_1 ∧  b^{9, 119}_0 ∧ true) 
c  in CNF:
c    -b^{9, 119}_2 ∨ -b^{9, 119}_1 ∨ -b^{9, 119}_0 ∨ false 
c  in DIMACS:
-11000 -11001 -11002  0

c i = 120
c  -2+1 --> -1
c    ( b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧  p_1080) -> ( b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0)
c  in CNF:
c    -b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨  b^{9, 121}_2
c    -b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_1
c    -b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨  b^{9, 121}_0
c  in DIMACS:
-11003 -11004  11005 -1080  11006 0
-11003 -11004  11005 -1080 -11007 0
-11003 -11004  11005 -1080  11008 0

c  -1+1 --> 0
c    ( b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0 ∧  p_1080) -> (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧ -b^{9, 121}_0)
c  in CNF:
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_2
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_1
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_0
c  in DIMACS:
-11003  11004 -11005 -1080 -11006 0
-11003  11004 -11005 -1080 -11007 0
-11003  11004 -11005 -1080 -11008 0

c  0+1 --> 1
c    (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧  p_1080) -> (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0)
c  in CNF:
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_2
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_1
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨  b^{9, 121}_0
c  in DIMACS:
 11003  11004  11005 -1080 -11006 0
 11003  11004  11005 -1080 -11007 0
 11003  11004  11005 -1080  11008 0

c  1+1 --> 2
c    (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0 ∧  p_1080) -> (-b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0)
c  in CNF:
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_2
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨  b^{9, 121}_1
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ -p_1080 ∨ -b^{9, 121}_0
c  in DIMACS:
 11003  11004 -11005 -1080 -11006 0
 11003  11004 -11005 -1080  11007 0
 11003  11004 -11005 -1080 -11008 0

c  2+1 --> break 
c    (-b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 11003 -11004  11005 -1080 1162 0


c  2-1 --> 1
c    (-b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧ -p_1080) -> (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0)
c  in CNF:
c     b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_2
c     b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_1
c     b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨  b^{9, 121}_0
c  in DIMACS:
 11003 -11004  11005  1080 -11006 0
 11003 -11004  11005  1080 -11007 0
 11003 -11004  11005  1080  11008 0

c  1-1 --> 0
c    (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0 ∧ -p_1080) -> (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧ -b^{9, 121}_0)
c  in CNF:
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_2
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_1
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_0
c  in DIMACS:
 11003  11004 -11005  1080 -11006 0
 11003  11004 -11005  1080 -11007 0
 11003  11004 -11005  1080 -11008 0

c  0-1 --> -1
c    (-b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧ -p_1080) -> ( b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0)
c  in CNF:
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨  b^{9, 121}_2
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_1
c     b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨  b^{9, 121}_0
c  in DIMACS:
 11003  11004  11005  1080  11006 0
 11003  11004  11005  1080 -11007 0
 11003  11004  11005  1080  11008 0

c  -1-1 --> -2
c    ( b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧  b^{9, 120}_0 ∧ -p_1080) -> ( b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0)
c  in CNF:
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨  b^{9, 121}_2
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨  b^{9, 121}_1
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨  p_1080 ∨ -b^{9, 121}_0
c  in DIMACS:
-11003  11004 -11005  1080  11006 0
-11003  11004 -11005  1080  11007 0
-11003  11004 -11005  1080 -11008 0

c  -2-1 --> break 
c    ( b^{9, 120}_2 ∧  b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨  b^{9, 120}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-11003 -11004  11005  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 120}_2 ∧ -b^{9, 120}_1 ∧ -b^{9, 120}_0 ∧ true) 
c  in CNF:
c    -b^{9, 120}_2 ∨  b^{9, 120}_1 ∨  b^{9, 120}_0 ∨ false 
c  in DIMACS:
-11003  11004  11005  0

c  3 does not represent an automaton state.
c    -(-b^{9, 120}_2 ∧  b^{9, 120}_1 ∧  b^{9, 120}_0 ∧ true) 
c  in CNF:
c     b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ false 
c  in DIMACS:
 11003 -11004 -11005  0
c  -3 does not represent an automaton state.
c    -( b^{9, 120}_2 ∧  b^{9, 120}_1 ∧  b^{9, 120}_0 ∧ true) 
c  in CNF:
c    -b^{9, 120}_2 ∨ -b^{9, 120}_1 ∨ -b^{9, 120}_0 ∨ false 
c  in DIMACS:
-11003 -11004 -11005  0

c i = 121
c  -2+1 --> -1
c    ( b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧  p_1089) -> ( b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0)
c  in CNF:
c    -b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨  b^{9, 122}_2
c    -b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_1
c    -b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨  b^{9, 122}_0
c  in DIMACS:
-11006 -11007  11008 -1089  11009 0
-11006 -11007  11008 -1089 -11010 0
-11006 -11007  11008 -1089  11011 0

c  -1+1 --> 0
c    ( b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0 ∧  p_1089) -> (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧ -b^{9, 122}_0)
c  in CNF:
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_2
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_1
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_0
c  in DIMACS:
-11006  11007 -11008 -1089 -11009 0
-11006  11007 -11008 -1089 -11010 0
-11006  11007 -11008 -1089 -11011 0

c  0+1 --> 1
c    (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧  p_1089) -> (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0)
c  in CNF:
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_2
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_1
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨  b^{9, 122}_0
c  in DIMACS:
 11006  11007  11008 -1089 -11009 0
 11006  11007  11008 -1089 -11010 0
 11006  11007  11008 -1089  11011 0

c  1+1 --> 2
c    (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0 ∧  p_1089) -> (-b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0)
c  in CNF:
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_2
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨  b^{9, 122}_1
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ -p_1089 ∨ -b^{9, 122}_0
c  in DIMACS:
 11006  11007 -11008 -1089 -11009 0
 11006  11007 -11008 -1089  11010 0
 11006  11007 -11008 -1089 -11011 0

c  2+1 --> break 
c    (-b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 11006 -11007  11008 -1089 1162 0


c  2-1 --> 1
c    (-b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧ -p_1089) -> (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0)
c  in CNF:
c     b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_2
c     b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_1
c     b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨  b^{9, 122}_0
c  in DIMACS:
 11006 -11007  11008  1089 -11009 0
 11006 -11007  11008  1089 -11010 0
 11006 -11007  11008  1089  11011 0

c  1-1 --> 0
c    (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0 ∧ -p_1089) -> (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧ -b^{9, 122}_0)
c  in CNF:
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_2
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_1
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_0
c  in DIMACS:
 11006  11007 -11008  1089 -11009 0
 11006  11007 -11008  1089 -11010 0
 11006  11007 -11008  1089 -11011 0

c  0-1 --> -1
c    (-b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧ -p_1089) -> ( b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0)
c  in CNF:
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨  b^{9, 122}_2
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_1
c     b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨  b^{9, 122}_0
c  in DIMACS:
 11006  11007  11008  1089  11009 0
 11006  11007  11008  1089 -11010 0
 11006  11007  11008  1089  11011 0

c  -1-1 --> -2
c    ( b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧  b^{9, 121}_0 ∧ -p_1089) -> ( b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0)
c  in CNF:
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨  b^{9, 122}_2
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨  b^{9, 122}_1
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨  p_1089 ∨ -b^{9, 122}_0
c  in DIMACS:
-11006  11007 -11008  1089  11009 0
-11006  11007 -11008  1089  11010 0
-11006  11007 -11008  1089 -11011 0

c  -2-1 --> break 
c    ( b^{9, 121}_2 ∧  b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨  b^{9, 121}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-11006 -11007  11008  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 121}_2 ∧ -b^{9, 121}_1 ∧ -b^{9, 121}_0 ∧ true) 
c  in CNF:
c    -b^{9, 121}_2 ∨  b^{9, 121}_1 ∨  b^{9, 121}_0 ∨ false 
c  in DIMACS:
-11006  11007  11008  0

c  3 does not represent an automaton state.
c    -(-b^{9, 121}_2 ∧  b^{9, 121}_1 ∧  b^{9, 121}_0 ∧ true) 
c  in CNF:
c     b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ false 
c  in DIMACS:
 11006 -11007 -11008  0
c  -3 does not represent an automaton state.
c    -( b^{9, 121}_2 ∧  b^{9, 121}_1 ∧  b^{9, 121}_0 ∧ true) 
c  in CNF:
c    -b^{9, 121}_2 ∨ -b^{9, 121}_1 ∨ -b^{9, 121}_0 ∨ false 
c  in DIMACS:
-11006 -11007 -11008  0

c i = 122
c  -2+1 --> -1
c    ( b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧  p_1098) -> ( b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0)
c  in CNF:
c    -b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨  b^{9, 123}_2
c    -b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_1
c    -b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨  b^{9, 123}_0
c  in DIMACS:
-11009 -11010  11011 -1098  11012 0
-11009 -11010  11011 -1098 -11013 0
-11009 -11010  11011 -1098  11014 0

c  -1+1 --> 0
c    ( b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0 ∧  p_1098) -> (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧ -b^{9, 123}_0)
c  in CNF:
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_2
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_1
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_0
c  in DIMACS:
-11009  11010 -11011 -1098 -11012 0
-11009  11010 -11011 -1098 -11013 0
-11009  11010 -11011 -1098 -11014 0

c  0+1 --> 1
c    (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧  p_1098) -> (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0)
c  in CNF:
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_2
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_1
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨  b^{9, 123}_0
c  in DIMACS:
 11009  11010  11011 -1098 -11012 0
 11009  11010  11011 -1098 -11013 0
 11009  11010  11011 -1098  11014 0

c  1+1 --> 2
c    (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0 ∧  p_1098) -> (-b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0)
c  in CNF:
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_2
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨  b^{9, 123}_1
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ -p_1098 ∨ -b^{9, 123}_0
c  in DIMACS:
 11009  11010 -11011 -1098 -11012 0
 11009  11010 -11011 -1098  11013 0
 11009  11010 -11011 -1098 -11014 0

c  2+1 --> break 
c    (-b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 11009 -11010  11011 -1098 1162 0


c  2-1 --> 1
c    (-b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧ -p_1098) -> (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0)
c  in CNF:
c     b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_2
c     b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_1
c     b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨  b^{9, 123}_0
c  in DIMACS:
 11009 -11010  11011  1098 -11012 0
 11009 -11010  11011  1098 -11013 0
 11009 -11010  11011  1098  11014 0

c  1-1 --> 0
c    (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0 ∧ -p_1098) -> (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧ -b^{9, 123}_0)
c  in CNF:
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_2
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_1
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_0
c  in DIMACS:
 11009  11010 -11011  1098 -11012 0
 11009  11010 -11011  1098 -11013 0
 11009  11010 -11011  1098 -11014 0

c  0-1 --> -1
c    (-b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧ -p_1098) -> ( b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0)
c  in CNF:
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨  b^{9, 123}_2
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_1
c     b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨  b^{9, 123}_0
c  in DIMACS:
 11009  11010  11011  1098  11012 0
 11009  11010  11011  1098 -11013 0
 11009  11010  11011  1098  11014 0

c  -1-1 --> -2
c    ( b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧  b^{9, 122}_0 ∧ -p_1098) -> ( b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0)
c  in CNF:
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨  b^{9, 123}_2
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨  b^{9, 123}_1
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨  p_1098 ∨ -b^{9, 123}_0
c  in DIMACS:
-11009  11010 -11011  1098  11012 0
-11009  11010 -11011  1098  11013 0
-11009  11010 -11011  1098 -11014 0

c  -2-1 --> break 
c    ( b^{9, 122}_2 ∧  b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨  b^{9, 122}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-11009 -11010  11011  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 122}_2 ∧ -b^{9, 122}_1 ∧ -b^{9, 122}_0 ∧ true) 
c  in CNF:
c    -b^{9, 122}_2 ∨  b^{9, 122}_1 ∨  b^{9, 122}_0 ∨ false 
c  in DIMACS:
-11009  11010  11011  0

c  3 does not represent an automaton state.
c    -(-b^{9, 122}_2 ∧  b^{9, 122}_1 ∧  b^{9, 122}_0 ∧ true) 
c  in CNF:
c     b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ false 
c  in DIMACS:
 11009 -11010 -11011  0
c  -3 does not represent an automaton state.
c    -( b^{9, 122}_2 ∧  b^{9, 122}_1 ∧  b^{9, 122}_0 ∧ true) 
c  in CNF:
c    -b^{9, 122}_2 ∨ -b^{9, 122}_1 ∨ -b^{9, 122}_0 ∨ false 
c  in DIMACS:
-11009 -11010 -11011  0

c i = 123
c  -2+1 --> -1
c    ( b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧  p_1107) -> ( b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0)
c  in CNF:
c    -b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨  b^{9, 124}_2
c    -b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_1
c    -b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨  b^{9, 124}_0
c  in DIMACS:
-11012 -11013  11014 -1107  11015 0
-11012 -11013  11014 -1107 -11016 0
-11012 -11013  11014 -1107  11017 0

c  -1+1 --> 0
c    ( b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0 ∧  p_1107) -> (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧ -b^{9, 124}_0)
c  in CNF:
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_2
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_1
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_0
c  in DIMACS:
-11012  11013 -11014 -1107 -11015 0
-11012  11013 -11014 -1107 -11016 0
-11012  11013 -11014 -1107 -11017 0

c  0+1 --> 1
c    (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧  p_1107) -> (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0)
c  in CNF:
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_2
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_1
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨  b^{9, 124}_0
c  in DIMACS:
 11012  11013  11014 -1107 -11015 0
 11012  11013  11014 -1107 -11016 0
 11012  11013  11014 -1107  11017 0

c  1+1 --> 2
c    (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0 ∧  p_1107) -> (-b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0)
c  in CNF:
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_2
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨  b^{9, 124}_1
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ -p_1107 ∨ -b^{9, 124}_0
c  in DIMACS:
 11012  11013 -11014 -1107 -11015 0
 11012  11013 -11014 -1107  11016 0
 11012  11013 -11014 -1107 -11017 0

c  2+1 --> break 
c    (-b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 11012 -11013  11014 -1107 1162 0


c  2-1 --> 1
c    (-b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧ -p_1107) -> (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0)
c  in CNF:
c     b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_2
c     b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_1
c     b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨  b^{9, 124}_0
c  in DIMACS:
 11012 -11013  11014  1107 -11015 0
 11012 -11013  11014  1107 -11016 0
 11012 -11013  11014  1107  11017 0

c  1-1 --> 0
c    (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0 ∧ -p_1107) -> (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧ -b^{9, 124}_0)
c  in CNF:
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_2
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_1
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_0
c  in DIMACS:
 11012  11013 -11014  1107 -11015 0
 11012  11013 -11014  1107 -11016 0
 11012  11013 -11014  1107 -11017 0

c  0-1 --> -1
c    (-b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧ -p_1107) -> ( b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0)
c  in CNF:
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨  b^{9, 124}_2
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_1
c     b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨  b^{9, 124}_0
c  in DIMACS:
 11012  11013  11014  1107  11015 0
 11012  11013  11014  1107 -11016 0
 11012  11013  11014  1107  11017 0

c  -1-1 --> -2
c    ( b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧  b^{9, 123}_0 ∧ -p_1107) -> ( b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0)
c  in CNF:
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨  b^{9, 124}_2
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨  b^{9, 124}_1
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨  p_1107 ∨ -b^{9, 124}_0
c  in DIMACS:
-11012  11013 -11014  1107  11015 0
-11012  11013 -11014  1107  11016 0
-11012  11013 -11014  1107 -11017 0

c  -2-1 --> break 
c    ( b^{9, 123}_2 ∧  b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨  b^{9, 123}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-11012 -11013  11014  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 123}_2 ∧ -b^{9, 123}_1 ∧ -b^{9, 123}_0 ∧ true) 
c  in CNF:
c    -b^{9, 123}_2 ∨  b^{9, 123}_1 ∨  b^{9, 123}_0 ∨ false 
c  in DIMACS:
-11012  11013  11014  0

c  3 does not represent an automaton state.
c    -(-b^{9, 123}_2 ∧  b^{9, 123}_1 ∧  b^{9, 123}_0 ∧ true) 
c  in CNF:
c     b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ false 
c  in DIMACS:
 11012 -11013 -11014  0
c  -3 does not represent an automaton state.
c    -( b^{9, 123}_2 ∧  b^{9, 123}_1 ∧  b^{9, 123}_0 ∧ true) 
c  in CNF:
c    -b^{9, 123}_2 ∨ -b^{9, 123}_1 ∨ -b^{9, 123}_0 ∨ false 
c  in DIMACS:
-11012 -11013 -11014  0

c i = 124
c  -2+1 --> -1
c    ( b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧  p_1116) -> ( b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0)
c  in CNF:
c    -b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨  b^{9, 125}_2
c    -b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_1
c    -b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨  b^{9, 125}_0
c  in DIMACS:
-11015 -11016  11017 -1116  11018 0
-11015 -11016  11017 -1116 -11019 0
-11015 -11016  11017 -1116  11020 0

c  -1+1 --> 0
c    ( b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0 ∧  p_1116) -> (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧ -b^{9, 125}_0)
c  in CNF:
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_2
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_1
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_0
c  in DIMACS:
-11015  11016 -11017 -1116 -11018 0
-11015  11016 -11017 -1116 -11019 0
-11015  11016 -11017 -1116 -11020 0

c  0+1 --> 1
c    (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧  p_1116) -> (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0)
c  in CNF:
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_2
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_1
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨  b^{9, 125}_0
c  in DIMACS:
 11015  11016  11017 -1116 -11018 0
 11015  11016  11017 -1116 -11019 0
 11015  11016  11017 -1116  11020 0

c  1+1 --> 2
c    (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0 ∧  p_1116) -> (-b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0)
c  in CNF:
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_2
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨  b^{9, 125}_1
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ -p_1116 ∨ -b^{9, 125}_0
c  in DIMACS:
 11015  11016 -11017 -1116 -11018 0
 11015  11016 -11017 -1116  11019 0
 11015  11016 -11017 -1116 -11020 0

c  2+1 --> break 
c    (-b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 11015 -11016  11017 -1116 1162 0


c  2-1 --> 1
c    (-b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧ -p_1116) -> (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0)
c  in CNF:
c     b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_2
c     b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_1
c     b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨  b^{9, 125}_0
c  in DIMACS:
 11015 -11016  11017  1116 -11018 0
 11015 -11016  11017  1116 -11019 0
 11015 -11016  11017  1116  11020 0

c  1-1 --> 0
c    (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0 ∧ -p_1116) -> (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧ -b^{9, 125}_0)
c  in CNF:
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_2
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_1
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_0
c  in DIMACS:
 11015  11016 -11017  1116 -11018 0
 11015  11016 -11017  1116 -11019 0
 11015  11016 -11017  1116 -11020 0

c  0-1 --> -1
c    (-b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧ -p_1116) -> ( b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0)
c  in CNF:
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨  b^{9, 125}_2
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_1
c     b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨  b^{9, 125}_0
c  in DIMACS:
 11015  11016  11017  1116  11018 0
 11015  11016  11017  1116 -11019 0
 11015  11016  11017  1116  11020 0

c  -1-1 --> -2
c    ( b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧  b^{9, 124}_0 ∧ -p_1116) -> ( b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0)
c  in CNF:
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨  b^{9, 125}_2
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨  b^{9, 125}_1
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨  p_1116 ∨ -b^{9, 125}_0
c  in DIMACS:
-11015  11016 -11017  1116  11018 0
-11015  11016 -11017  1116  11019 0
-11015  11016 -11017  1116 -11020 0

c  -2-1 --> break 
c    ( b^{9, 124}_2 ∧  b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨  b^{9, 124}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-11015 -11016  11017  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 124}_2 ∧ -b^{9, 124}_1 ∧ -b^{9, 124}_0 ∧ true) 
c  in CNF:
c    -b^{9, 124}_2 ∨  b^{9, 124}_1 ∨  b^{9, 124}_0 ∨ false 
c  in DIMACS:
-11015  11016  11017  0

c  3 does not represent an automaton state.
c    -(-b^{9, 124}_2 ∧  b^{9, 124}_1 ∧  b^{9, 124}_0 ∧ true) 
c  in CNF:
c     b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ false 
c  in DIMACS:
 11015 -11016 -11017  0
c  -3 does not represent an automaton state.
c    -( b^{9, 124}_2 ∧  b^{9, 124}_1 ∧  b^{9, 124}_0 ∧ true) 
c  in CNF:
c    -b^{9, 124}_2 ∨ -b^{9, 124}_1 ∨ -b^{9, 124}_0 ∨ false 
c  in DIMACS:
-11015 -11016 -11017  0

c i = 125
c  -2+1 --> -1
c    ( b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧  p_1125) -> ( b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0)
c  in CNF:
c    -b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨  b^{9, 126}_2
c    -b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_1
c    -b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨  b^{9, 126}_0
c  in DIMACS:
-11018 -11019  11020 -1125  11021 0
-11018 -11019  11020 -1125 -11022 0
-11018 -11019  11020 -1125  11023 0

c  -1+1 --> 0
c    ( b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0 ∧  p_1125) -> (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧ -b^{9, 126}_0)
c  in CNF:
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_2
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_1
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_0
c  in DIMACS:
-11018  11019 -11020 -1125 -11021 0
-11018  11019 -11020 -1125 -11022 0
-11018  11019 -11020 -1125 -11023 0

c  0+1 --> 1
c    (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧  p_1125) -> (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0)
c  in CNF:
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_2
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_1
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨  b^{9, 126}_0
c  in DIMACS:
 11018  11019  11020 -1125 -11021 0
 11018  11019  11020 -1125 -11022 0
 11018  11019  11020 -1125  11023 0

c  1+1 --> 2
c    (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0 ∧  p_1125) -> (-b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0)
c  in CNF:
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_2
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨  b^{9, 126}_1
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ -p_1125 ∨ -b^{9, 126}_0
c  in DIMACS:
 11018  11019 -11020 -1125 -11021 0
 11018  11019 -11020 -1125  11022 0
 11018  11019 -11020 -1125 -11023 0

c  2+1 --> break 
c    (-b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 11018 -11019  11020 -1125 1162 0


c  2-1 --> 1
c    (-b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧ -p_1125) -> (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0)
c  in CNF:
c     b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_2
c     b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_1
c     b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨  b^{9, 126}_0
c  in DIMACS:
 11018 -11019  11020  1125 -11021 0
 11018 -11019  11020  1125 -11022 0
 11018 -11019  11020  1125  11023 0

c  1-1 --> 0
c    (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0 ∧ -p_1125) -> (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧ -b^{9, 126}_0)
c  in CNF:
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_2
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_1
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_0
c  in DIMACS:
 11018  11019 -11020  1125 -11021 0
 11018  11019 -11020  1125 -11022 0
 11018  11019 -11020  1125 -11023 0

c  0-1 --> -1
c    (-b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧ -p_1125) -> ( b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0)
c  in CNF:
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨  b^{9, 126}_2
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_1
c     b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨  b^{9, 126}_0
c  in DIMACS:
 11018  11019  11020  1125  11021 0
 11018  11019  11020  1125 -11022 0
 11018  11019  11020  1125  11023 0

c  -1-1 --> -2
c    ( b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧  b^{9, 125}_0 ∧ -p_1125) -> ( b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0)
c  in CNF:
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨  b^{9, 126}_2
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨  b^{9, 126}_1
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨  p_1125 ∨ -b^{9, 126}_0
c  in DIMACS:
-11018  11019 -11020  1125  11021 0
-11018  11019 -11020  1125  11022 0
-11018  11019 -11020  1125 -11023 0

c  -2-1 --> break 
c    ( b^{9, 125}_2 ∧  b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨  b^{9, 125}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-11018 -11019  11020  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 125}_2 ∧ -b^{9, 125}_1 ∧ -b^{9, 125}_0 ∧ true) 
c  in CNF:
c    -b^{9, 125}_2 ∨  b^{9, 125}_1 ∨  b^{9, 125}_0 ∨ false 
c  in DIMACS:
-11018  11019  11020  0

c  3 does not represent an automaton state.
c    -(-b^{9, 125}_2 ∧  b^{9, 125}_1 ∧  b^{9, 125}_0 ∧ true) 
c  in CNF:
c     b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ false 
c  in DIMACS:
 11018 -11019 -11020  0
c  -3 does not represent an automaton state.
c    -( b^{9, 125}_2 ∧  b^{9, 125}_1 ∧  b^{9, 125}_0 ∧ true) 
c  in CNF:
c    -b^{9, 125}_2 ∨ -b^{9, 125}_1 ∨ -b^{9, 125}_0 ∨ false 
c  in DIMACS:
-11018 -11019 -11020  0

c i = 126
c  -2+1 --> -1
c    ( b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧  p_1134) -> ( b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0)
c  in CNF:
c    -b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨  b^{9, 127}_2
c    -b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_1
c    -b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨  b^{9, 127}_0
c  in DIMACS:
-11021 -11022  11023 -1134  11024 0
-11021 -11022  11023 -1134 -11025 0
-11021 -11022  11023 -1134  11026 0

c  -1+1 --> 0
c    ( b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0 ∧  p_1134) -> (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧ -b^{9, 127}_0)
c  in CNF:
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_2
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_1
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_0
c  in DIMACS:
-11021  11022 -11023 -1134 -11024 0
-11021  11022 -11023 -1134 -11025 0
-11021  11022 -11023 -1134 -11026 0

c  0+1 --> 1
c    (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧  p_1134) -> (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0)
c  in CNF:
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_2
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_1
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨  b^{9, 127}_0
c  in DIMACS:
 11021  11022  11023 -1134 -11024 0
 11021  11022  11023 -1134 -11025 0
 11021  11022  11023 -1134  11026 0

c  1+1 --> 2
c    (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0 ∧  p_1134) -> (-b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0)
c  in CNF:
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_2
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨  b^{9, 127}_1
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ -p_1134 ∨ -b^{9, 127}_0
c  in DIMACS:
 11021  11022 -11023 -1134 -11024 0
 11021  11022 -11023 -1134  11025 0
 11021  11022 -11023 -1134 -11026 0

c  2+1 --> break 
c    (-b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 11021 -11022  11023 -1134 1162 0


c  2-1 --> 1
c    (-b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧ -p_1134) -> (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0)
c  in CNF:
c     b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_2
c     b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_1
c     b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨  b^{9, 127}_0
c  in DIMACS:
 11021 -11022  11023  1134 -11024 0
 11021 -11022  11023  1134 -11025 0
 11021 -11022  11023  1134  11026 0

c  1-1 --> 0
c    (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0 ∧ -p_1134) -> (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧ -b^{9, 127}_0)
c  in CNF:
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_2
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_1
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_0
c  in DIMACS:
 11021  11022 -11023  1134 -11024 0
 11021  11022 -11023  1134 -11025 0
 11021  11022 -11023  1134 -11026 0

c  0-1 --> -1
c    (-b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧ -p_1134) -> ( b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0)
c  in CNF:
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨  b^{9, 127}_2
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_1
c     b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨  b^{9, 127}_0
c  in DIMACS:
 11021  11022  11023  1134  11024 0
 11021  11022  11023  1134 -11025 0
 11021  11022  11023  1134  11026 0

c  -1-1 --> -2
c    ( b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧  b^{9, 126}_0 ∧ -p_1134) -> ( b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0)
c  in CNF:
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨  b^{9, 127}_2
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨  b^{9, 127}_1
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨  p_1134 ∨ -b^{9, 127}_0
c  in DIMACS:
-11021  11022 -11023  1134  11024 0
-11021  11022 -11023  1134  11025 0
-11021  11022 -11023  1134 -11026 0

c  -2-1 --> break 
c    ( b^{9, 126}_2 ∧  b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨  b^{9, 126}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-11021 -11022  11023  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 126}_2 ∧ -b^{9, 126}_1 ∧ -b^{9, 126}_0 ∧ true) 
c  in CNF:
c    -b^{9, 126}_2 ∨  b^{9, 126}_1 ∨  b^{9, 126}_0 ∨ false 
c  in DIMACS:
-11021  11022  11023  0

c  3 does not represent an automaton state.
c    -(-b^{9, 126}_2 ∧  b^{9, 126}_1 ∧  b^{9, 126}_0 ∧ true) 
c  in CNF:
c     b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ false 
c  in DIMACS:
 11021 -11022 -11023  0
c  -3 does not represent an automaton state.
c    -( b^{9, 126}_2 ∧  b^{9, 126}_1 ∧  b^{9, 126}_0 ∧ true) 
c  in CNF:
c    -b^{9, 126}_2 ∨ -b^{9, 126}_1 ∨ -b^{9, 126}_0 ∨ false 
c  in DIMACS:
-11021 -11022 -11023  0

c i = 127
c  -2+1 --> -1
c    ( b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧  p_1143) -> ( b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0)
c  in CNF:
c    -b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨  b^{9, 128}_2
c    -b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_1
c    -b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨  b^{9, 128}_0
c  in DIMACS:
-11024 -11025  11026 -1143  11027 0
-11024 -11025  11026 -1143 -11028 0
-11024 -11025  11026 -1143  11029 0

c  -1+1 --> 0
c    ( b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0 ∧  p_1143) -> (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧ -b^{9, 128}_0)
c  in CNF:
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_2
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_1
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_0
c  in DIMACS:
-11024  11025 -11026 -1143 -11027 0
-11024  11025 -11026 -1143 -11028 0
-11024  11025 -11026 -1143 -11029 0

c  0+1 --> 1
c    (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧  p_1143) -> (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0)
c  in CNF:
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_2
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_1
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨  b^{9, 128}_0
c  in DIMACS:
 11024  11025  11026 -1143 -11027 0
 11024  11025  11026 -1143 -11028 0
 11024  11025  11026 -1143  11029 0

c  1+1 --> 2
c    (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0 ∧  p_1143) -> (-b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0)
c  in CNF:
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_2
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨  b^{9, 128}_1
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ -p_1143 ∨ -b^{9, 128}_0
c  in DIMACS:
 11024  11025 -11026 -1143 -11027 0
 11024  11025 -11026 -1143  11028 0
 11024  11025 -11026 -1143 -11029 0

c  2+1 --> break 
c    (-b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧  p_1143) -> break
c  in CNF:
c     b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ -p_1143 ∨ break
c  in DIMACS:
 11024 -11025  11026 -1143 1162 0


c  2-1 --> 1
c    (-b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧ -p_1143) -> (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0)
c  in CNF:
c     b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_2
c     b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_1
c     b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨  b^{9, 128}_0
c  in DIMACS:
 11024 -11025  11026  1143 -11027 0
 11024 -11025  11026  1143 -11028 0
 11024 -11025  11026  1143  11029 0

c  1-1 --> 0
c    (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0 ∧ -p_1143) -> (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧ -b^{9, 128}_0)
c  in CNF:
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_2
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_1
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_0
c  in DIMACS:
 11024  11025 -11026  1143 -11027 0
 11024  11025 -11026  1143 -11028 0
 11024  11025 -11026  1143 -11029 0

c  0-1 --> -1
c    (-b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧ -p_1143) -> ( b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0)
c  in CNF:
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨  b^{9, 128}_2
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_1
c     b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨  b^{9, 128}_0
c  in DIMACS:
 11024  11025  11026  1143  11027 0
 11024  11025  11026  1143 -11028 0
 11024  11025  11026  1143  11029 0

c  -1-1 --> -2
c    ( b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧  b^{9, 127}_0 ∧ -p_1143) -> ( b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0)
c  in CNF:
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨  b^{9, 128}_2
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨  b^{9, 128}_1
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨  p_1143 ∨ -b^{9, 128}_0
c  in DIMACS:
-11024  11025 -11026  1143  11027 0
-11024  11025 -11026  1143  11028 0
-11024  11025 -11026  1143 -11029 0

c  -2-1 --> break 
c    ( b^{9, 127}_2 ∧  b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧ -p_1143) -> break
c  in CNF:
c    -b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨  b^{9, 127}_0 ∨  p_1143 ∨ break
c  in DIMACS:
-11024 -11025  11026  1143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 127}_2 ∧ -b^{9, 127}_1 ∧ -b^{9, 127}_0 ∧ true) 
c  in CNF:
c    -b^{9, 127}_2 ∨  b^{9, 127}_1 ∨  b^{9, 127}_0 ∨ false 
c  in DIMACS:
-11024  11025  11026  0

c  3 does not represent an automaton state.
c    -(-b^{9, 127}_2 ∧  b^{9, 127}_1 ∧  b^{9, 127}_0 ∧ true) 
c  in CNF:
c     b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ false 
c  in DIMACS:
 11024 -11025 -11026  0
c  -3 does not represent an automaton state.
c    -( b^{9, 127}_2 ∧  b^{9, 127}_1 ∧  b^{9, 127}_0 ∧ true) 
c  in CNF:
c    -b^{9, 127}_2 ∨ -b^{9, 127}_1 ∨ -b^{9, 127}_0 ∨ false 
c  in DIMACS:
-11024 -11025 -11026  0

c i = 128
c  -2+1 --> -1
c    ( b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧  p_1152) -> ( b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0)
c  in CNF:
c    -b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨  b^{9, 129}_2
c    -b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_1
c    -b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨  b^{9, 129}_0
c  in DIMACS:
-11027 -11028  11029 -1152  11030 0
-11027 -11028  11029 -1152 -11031 0
-11027 -11028  11029 -1152  11032 0

c  -1+1 --> 0
c    ( b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0 ∧  p_1152) -> (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧ -b^{9, 129}_0)
c  in CNF:
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_2
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_1
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_0
c  in DIMACS:
-11027  11028 -11029 -1152 -11030 0
-11027  11028 -11029 -1152 -11031 0
-11027  11028 -11029 -1152 -11032 0

c  0+1 --> 1
c    (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧  p_1152) -> (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0)
c  in CNF:
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_2
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_1
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨  b^{9, 129}_0
c  in DIMACS:
 11027  11028  11029 -1152 -11030 0
 11027  11028  11029 -1152 -11031 0
 11027  11028  11029 -1152  11032 0

c  1+1 --> 2
c    (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0 ∧  p_1152) -> (-b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0)
c  in CNF:
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_2
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨  b^{9, 129}_1
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ -p_1152 ∨ -b^{9, 129}_0
c  in DIMACS:
 11027  11028 -11029 -1152 -11030 0
 11027  11028 -11029 -1152  11031 0
 11027  11028 -11029 -1152 -11032 0

c  2+1 --> break 
c    (-b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 11027 -11028  11029 -1152 1162 0


c  2-1 --> 1
c    (-b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧ -p_1152) -> (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0)
c  in CNF:
c     b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_2
c     b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_1
c     b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨  b^{9, 129}_0
c  in DIMACS:
 11027 -11028  11029  1152 -11030 0
 11027 -11028  11029  1152 -11031 0
 11027 -11028  11029  1152  11032 0

c  1-1 --> 0
c    (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0 ∧ -p_1152) -> (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧ -b^{9, 129}_0)
c  in CNF:
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_2
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_1
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_0
c  in DIMACS:
 11027  11028 -11029  1152 -11030 0
 11027  11028 -11029  1152 -11031 0
 11027  11028 -11029  1152 -11032 0

c  0-1 --> -1
c    (-b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧ -p_1152) -> ( b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0)
c  in CNF:
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨  b^{9, 129}_2
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_1
c     b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨  b^{9, 129}_0
c  in DIMACS:
 11027  11028  11029  1152  11030 0
 11027  11028  11029  1152 -11031 0
 11027  11028  11029  1152  11032 0

c  -1-1 --> -2
c    ( b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧  b^{9, 128}_0 ∧ -p_1152) -> ( b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0)
c  in CNF:
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨  b^{9, 129}_2
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨  b^{9, 129}_1
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨  p_1152 ∨ -b^{9, 129}_0
c  in DIMACS:
-11027  11028 -11029  1152  11030 0
-11027  11028 -11029  1152  11031 0
-11027  11028 -11029  1152 -11032 0

c  -2-1 --> break 
c    ( b^{9, 128}_2 ∧  b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨  b^{9, 128}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-11027 -11028  11029  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 128}_2 ∧ -b^{9, 128}_1 ∧ -b^{9, 128}_0 ∧ true) 
c  in CNF:
c    -b^{9, 128}_2 ∨  b^{9, 128}_1 ∨  b^{9, 128}_0 ∨ false 
c  in DIMACS:
-11027  11028  11029  0

c  3 does not represent an automaton state.
c    -(-b^{9, 128}_2 ∧  b^{9, 128}_1 ∧  b^{9, 128}_0 ∧ true) 
c  in CNF:
c     b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ false 
c  in DIMACS:
 11027 -11028 -11029  0
c  -3 does not represent an automaton state.
c    -( b^{9, 128}_2 ∧  b^{9, 128}_1 ∧  b^{9, 128}_0 ∧ true) 
c  in CNF:
c    -b^{9, 128}_2 ∨ -b^{9, 128}_1 ∨ -b^{9, 128}_0 ∨ false 
c  in DIMACS:
-11027 -11028 -11029  0

c i = 129
c  -2+1 --> -1
c    ( b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧  p_1161) -> ( b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧  b^{9, 130}_0)
c  in CNF:
c    -b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨  b^{9, 130}_2
c    -b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_1
c    -b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨  b^{9, 130}_0
c  in DIMACS:
-11030 -11031  11032 -1161  11033 0
-11030 -11031  11032 -1161 -11034 0
-11030 -11031  11032 -1161  11035 0

c  -1+1 --> 0
c    ( b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0 ∧  p_1161) -> (-b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧ -b^{9, 130}_0)
c  in CNF:
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_2
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_1
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_0
c  in DIMACS:
-11030  11031 -11032 -1161 -11033 0
-11030  11031 -11032 -1161 -11034 0
-11030  11031 -11032 -1161 -11035 0

c  0+1 --> 1
c    (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧  p_1161) -> (-b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧  b^{9, 130}_0)
c  in CNF:
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_2
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_1
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨  b^{9, 130}_0
c  in DIMACS:
 11030  11031  11032 -1161 -11033 0
 11030  11031  11032 -1161 -11034 0
 11030  11031  11032 -1161  11035 0

c  1+1 --> 2
c    (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0 ∧  p_1161) -> (-b^{9, 130}_2 ∧  b^{9, 130}_1 ∧ -b^{9, 130}_0)
c  in CNF:
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_2
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨  b^{9, 130}_1
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ -p_1161 ∨ -b^{9, 130}_0
c  in DIMACS:
 11030  11031 -11032 -1161 -11033 0
 11030  11031 -11032 -1161  11034 0
 11030  11031 -11032 -1161 -11035 0

c  2+1 --> break 
c    (-b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 11030 -11031  11032 -1161 1162 0


c  2-1 --> 1
c    (-b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧ -p_1161) -> (-b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧  b^{9, 130}_0)
c  in CNF:
c     b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_2
c     b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_1
c     b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨  b^{9, 130}_0
c  in DIMACS:
 11030 -11031  11032  1161 -11033 0
 11030 -11031  11032  1161 -11034 0
 11030 -11031  11032  1161  11035 0

c  1-1 --> 0
c    (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0 ∧ -p_1161) -> (-b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧ -b^{9, 130}_0)
c  in CNF:
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_2
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_1
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_0
c  in DIMACS:
 11030  11031 -11032  1161 -11033 0
 11030  11031 -11032  1161 -11034 0
 11030  11031 -11032  1161 -11035 0

c  0-1 --> -1
c    (-b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧ -p_1161) -> ( b^{9, 130}_2 ∧ -b^{9, 130}_1 ∧  b^{9, 130}_0)
c  in CNF:
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨  b^{9, 130}_2
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_1
c     b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨  b^{9, 130}_0
c  in DIMACS:
 11030  11031  11032  1161  11033 0
 11030  11031  11032  1161 -11034 0
 11030  11031  11032  1161  11035 0

c  -1-1 --> -2
c    ( b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧  b^{9, 129}_0 ∧ -p_1161) -> ( b^{9, 130}_2 ∧  b^{9, 130}_1 ∧ -b^{9, 130}_0)
c  in CNF:
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨  b^{9, 130}_2
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨  b^{9, 130}_1
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨  p_1161 ∨ -b^{9, 130}_0
c  in DIMACS:
-11030  11031 -11032  1161  11033 0
-11030  11031 -11032  1161  11034 0
-11030  11031 -11032  1161 -11035 0

c  -2-1 --> break 
c    ( b^{9, 129}_2 ∧  b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨  b^{9, 129}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-11030 -11031  11032  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{9, 129}_2 ∧ -b^{9, 129}_1 ∧ -b^{9, 129}_0 ∧ true) 
c  in CNF:
c    -b^{9, 129}_2 ∨  b^{9, 129}_1 ∨  b^{9, 129}_0 ∨ false 
c  in DIMACS:
-11030  11031  11032  0

c  3 does not represent an automaton state.
c    -(-b^{9, 129}_2 ∧  b^{9, 129}_1 ∧  b^{9, 129}_0 ∧ true) 
c  in CNF:
c     b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ false 
c  in DIMACS:
 11030 -11031 -11032  0
c  -3 does not represent an automaton state.
c    -( b^{9, 129}_2 ∧  b^{9, 129}_1 ∧  b^{9, 129}_0 ∧ true) 
c  in CNF:
c    -b^{9, 129}_2 ∨ -b^{9, 129}_1 ∨ -b^{9, 129}_0 ∨ false 
c  in DIMACS:
-11030 -11031 -11032  0

c INIT for k = 10
c    -b^{10, 1}_2
c    -b^{10, 1}_1
c    -b^{10, 1}_0
c  in DIMACS:
-11036 0
-11037 0
-11038 0

c Transitions for k = 10
c i = 1
c  -2+1 --> -1
c    ( b^{10, 1}_2 ∧  b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧  p_10) -> ( b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0)
c  in CNF:
c    -b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨  b^{10, 2}_2
c    -b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_1
c    -b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨  b^{10, 2}_0
c  in DIMACS:
-11036 -11037  11038 -10  11039 0
-11036 -11037  11038 -10 -11040 0
-11036 -11037  11038 -10  11041 0

c  -1+1 --> 0
c    ( b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧  b^{10, 1}_0 ∧  p_10) -> (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧ -b^{10, 2}_0)
c  in CNF:
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_2
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_1
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_0
c  in DIMACS:
-11036  11037 -11038 -10 -11039 0
-11036  11037 -11038 -10 -11040 0
-11036  11037 -11038 -10 -11041 0

c  0+1 --> 1
c    (-b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧  p_10) -> (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0)
c  in CNF:
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_2
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_1
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨  b^{10, 2}_0
c  in DIMACS:
 11036  11037  11038 -10 -11039 0
 11036  11037  11038 -10 -11040 0
 11036  11037  11038 -10  11041 0

c  1+1 --> 2
c    (-b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧  b^{10, 1}_0 ∧  p_10) -> (-b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0)
c  in CNF:
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_2
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨  b^{10, 2}_1
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ -p_10 ∨ -b^{10, 2}_0
c  in DIMACS:
 11036  11037 -11038 -10 -11039 0
 11036  11037 -11038 -10  11040 0
 11036  11037 -11038 -10 -11041 0

c  2+1 --> break 
c    (-b^{10, 1}_2 ∧  b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧  p_10) -> break
c  in CNF:
c     b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ -p_10 ∨ break
c  in DIMACS:
 11036 -11037  11038 -10 1162 0


c  2-1 --> 1
c    (-b^{10, 1}_2 ∧  b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧ -p_10) -> (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0)
c  in CNF:
c     b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_2
c     b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_1
c     b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨  b^{10, 2}_0
c  in DIMACS:
 11036 -11037  11038  10 -11039 0
 11036 -11037  11038  10 -11040 0
 11036 -11037  11038  10  11041 0

c  1-1 --> 0
c    (-b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧  b^{10, 1}_0 ∧ -p_10) -> (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧ -b^{10, 2}_0)
c  in CNF:
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_2
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_1
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_0
c  in DIMACS:
 11036  11037 -11038  10 -11039 0
 11036  11037 -11038  10 -11040 0
 11036  11037 -11038  10 -11041 0

c  0-1 --> -1
c    (-b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧ -p_10) -> ( b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0)
c  in CNF:
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨  b^{10, 2}_2
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_1
c     b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨  b^{10, 2}_0
c  in DIMACS:
 11036  11037  11038  10  11039 0
 11036  11037  11038  10 -11040 0
 11036  11037  11038  10  11041 0

c  -1-1 --> -2
c    ( b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧  b^{10, 1}_0 ∧ -p_10) -> ( b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0)
c  in CNF:
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨  b^{10, 2}_2
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨  b^{10, 2}_1
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨  p_10 ∨ -b^{10, 2}_0
c  in DIMACS:
-11036  11037 -11038  10  11039 0
-11036  11037 -11038  10  11040 0
-11036  11037 -11038  10 -11041 0

c  -2-1 --> break 
c    ( b^{10, 1}_2 ∧  b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧ -p_10) -> break
c  in CNF:
c    -b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨  b^{10, 1}_0 ∨  p_10 ∨ break
c  in DIMACS:
-11036 -11037  11038  10 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 1}_2 ∧ -b^{10, 1}_1 ∧ -b^{10, 1}_0 ∧ true) 
c  in CNF:
c    -b^{10, 1}_2 ∨  b^{10, 1}_1 ∨  b^{10, 1}_0 ∨ false 
c  in DIMACS:
-11036  11037  11038  0

c  3 does not represent an automaton state.
c    -(-b^{10, 1}_2 ∧  b^{10, 1}_1 ∧  b^{10, 1}_0 ∧ true) 
c  in CNF:
c     b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ false 
c  in DIMACS:
 11036 -11037 -11038  0
c  -3 does not represent an automaton state.
c    -( b^{10, 1}_2 ∧  b^{10, 1}_1 ∧  b^{10, 1}_0 ∧ true) 
c  in CNF:
c    -b^{10, 1}_2 ∨ -b^{10, 1}_1 ∨ -b^{10, 1}_0 ∨ false 
c  in DIMACS:
-11036 -11037 -11038  0

c i = 2
c  -2+1 --> -1
c    ( b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧  p_20) -> ( b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0)
c  in CNF:
c    -b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨  b^{10, 3}_2
c    -b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_1
c    -b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨  b^{10, 3}_0
c  in DIMACS:
-11039 -11040  11041 -20  11042 0
-11039 -11040  11041 -20 -11043 0
-11039 -11040  11041 -20  11044 0

c  -1+1 --> 0
c    ( b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0 ∧  p_20) -> (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧ -b^{10, 3}_0)
c  in CNF:
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_2
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_1
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_0
c  in DIMACS:
-11039  11040 -11041 -20 -11042 0
-11039  11040 -11041 -20 -11043 0
-11039  11040 -11041 -20 -11044 0

c  0+1 --> 1
c    (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧  p_20) -> (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0)
c  in CNF:
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_2
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_1
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨  b^{10, 3}_0
c  in DIMACS:
 11039  11040  11041 -20 -11042 0
 11039  11040  11041 -20 -11043 0
 11039  11040  11041 -20  11044 0

c  1+1 --> 2
c    (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0 ∧  p_20) -> (-b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0)
c  in CNF:
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_2
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨  b^{10, 3}_1
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ -p_20 ∨ -b^{10, 3}_0
c  in DIMACS:
 11039  11040 -11041 -20 -11042 0
 11039  11040 -11041 -20  11043 0
 11039  11040 -11041 -20 -11044 0

c  2+1 --> break 
c    (-b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧  p_20) -> break
c  in CNF:
c     b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 11039 -11040  11041 -20 1162 0


c  2-1 --> 1
c    (-b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧ -p_20) -> (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0)
c  in CNF:
c     b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_2
c     b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_1
c     b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨  b^{10, 3}_0
c  in DIMACS:
 11039 -11040  11041  20 -11042 0
 11039 -11040  11041  20 -11043 0
 11039 -11040  11041  20  11044 0

c  1-1 --> 0
c    (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0 ∧ -p_20) -> (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧ -b^{10, 3}_0)
c  in CNF:
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_2
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_1
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_0
c  in DIMACS:
 11039  11040 -11041  20 -11042 0
 11039  11040 -11041  20 -11043 0
 11039  11040 -11041  20 -11044 0

c  0-1 --> -1
c    (-b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧ -p_20) -> ( b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0)
c  in CNF:
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨  b^{10, 3}_2
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_1
c     b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨  b^{10, 3}_0
c  in DIMACS:
 11039  11040  11041  20  11042 0
 11039  11040  11041  20 -11043 0
 11039  11040  11041  20  11044 0

c  -1-1 --> -2
c    ( b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧  b^{10, 2}_0 ∧ -p_20) -> ( b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0)
c  in CNF:
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨  b^{10, 3}_2
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨  b^{10, 3}_1
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨  p_20 ∨ -b^{10, 3}_0
c  in DIMACS:
-11039  11040 -11041  20  11042 0
-11039  11040 -11041  20  11043 0
-11039  11040 -11041  20 -11044 0

c  -2-1 --> break 
c    ( b^{10, 2}_2 ∧  b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨  b^{10, 2}_0 ∨  p_20 ∨ break
c  in DIMACS:
-11039 -11040  11041  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 2}_2 ∧ -b^{10, 2}_1 ∧ -b^{10, 2}_0 ∧ true) 
c  in CNF:
c    -b^{10, 2}_2 ∨  b^{10, 2}_1 ∨  b^{10, 2}_0 ∨ false 
c  in DIMACS:
-11039  11040  11041  0

c  3 does not represent an automaton state.
c    -(-b^{10, 2}_2 ∧  b^{10, 2}_1 ∧  b^{10, 2}_0 ∧ true) 
c  in CNF:
c     b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ false 
c  in DIMACS:
 11039 -11040 -11041  0
c  -3 does not represent an automaton state.
c    -( b^{10, 2}_2 ∧  b^{10, 2}_1 ∧  b^{10, 2}_0 ∧ true) 
c  in CNF:
c    -b^{10, 2}_2 ∨ -b^{10, 2}_1 ∨ -b^{10, 2}_0 ∨ false 
c  in DIMACS:
-11039 -11040 -11041  0

c i = 3
c  -2+1 --> -1
c    ( b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧  p_30) -> ( b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0)
c  in CNF:
c    -b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨  b^{10, 4}_2
c    -b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_1
c    -b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨  b^{10, 4}_0
c  in DIMACS:
-11042 -11043  11044 -30  11045 0
-11042 -11043  11044 -30 -11046 0
-11042 -11043  11044 -30  11047 0

c  -1+1 --> 0
c    ( b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0 ∧  p_30) -> (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧ -b^{10, 4}_0)
c  in CNF:
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_2
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_1
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_0
c  in DIMACS:
-11042  11043 -11044 -30 -11045 0
-11042  11043 -11044 -30 -11046 0
-11042  11043 -11044 -30 -11047 0

c  0+1 --> 1
c    (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧  p_30) -> (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0)
c  in CNF:
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_2
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_1
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨  b^{10, 4}_0
c  in DIMACS:
 11042  11043  11044 -30 -11045 0
 11042  11043  11044 -30 -11046 0
 11042  11043  11044 -30  11047 0

c  1+1 --> 2
c    (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0 ∧  p_30) -> (-b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0)
c  in CNF:
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_2
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨  b^{10, 4}_1
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ -p_30 ∨ -b^{10, 4}_0
c  in DIMACS:
 11042  11043 -11044 -30 -11045 0
 11042  11043 -11044 -30  11046 0
 11042  11043 -11044 -30 -11047 0

c  2+1 --> break 
c    (-b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧  p_30) -> break
c  in CNF:
c     b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 11042 -11043  11044 -30 1162 0


c  2-1 --> 1
c    (-b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧ -p_30) -> (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0)
c  in CNF:
c     b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_2
c     b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_1
c     b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨  b^{10, 4}_0
c  in DIMACS:
 11042 -11043  11044  30 -11045 0
 11042 -11043  11044  30 -11046 0
 11042 -11043  11044  30  11047 0

c  1-1 --> 0
c    (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0 ∧ -p_30) -> (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧ -b^{10, 4}_0)
c  in CNF:
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_2
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_1
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_0
c  in DIMACS:
 11042  11043 -11044  30 -11045 0
 11042  11043 -11044  30 -11046 0
 11042  11043 -11044  30 -11047 0

c  0-1 --> -1
c    (-b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧ -p_30) -> ( b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0)
c  in CNF:
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨  b^{10, 4}_2
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_1
c     b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨  b^{10, 4}_0
c  in DIMACS:
 11042  11043  11044  30  11045 0
 11042  11043  11044  30 -11046 0
 11042  11043  11044  30  11047 0

c  -1-1 --> -2
c    ( b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧  b^{10, 3}_0 ∧ -p_30) -> ( b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0)
c  in CNF:
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨  b^{10, 4}_2
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨  b^{10, 4}_1
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨  p_30 ∨ -b^{10, 4}_0
c  in DIMACS:
-11042  11043 -11044  30  11045 0
-11042  11043 -11044  30  11046 0
-11042  11043 -11044  30 -11047 0

c  -2-1 --> break 
c    ( b^{10, 3}_2 ∧  b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨  b^{10, 3}_0 ∨  p_30 ∨ break
c  in DIMACS:
-11042 -11043  11044  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 3}_2 ∧ -b^{10, 3}_1 ∧ -b^{10, 3}_0 ∧ true) 
c  in CNF:
c    -b^{10, 3}_2 ∨  b^{10, 3}_1 ∨  b^{10, 3}_0 ∨ false 
c  in DIMACS:
-11042  11043  11044  0

c  3 does not represent an automaton state.
c    -(-b^{10, 3}_2 ∧  b^{10, 3}_1 ∧  b^{10, 3}_0 ∧ true) 
c  in CNF:
c     b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ false 
c  in DIMACS:
 11042 -11043 -11044  0
c  -3 does not represent an automaton state.
c    -( b^{10, 3}_2 ∧  b^{10, 3}_1 ∧  b^{10, 3}_0 ∧ true) 
c  in CNF:
c    -b^{10, 3}_2 ∨ -b^{10, 3}_1 ∨ -b^{10, 3}_0 ∨ false 
c  in DIMACS:
-11042 -11043 -11044  0

c i = 4
c  -2+1 --> -1
c    ( b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧  p_40) -> ( b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0)
c  in CNF:
c    -b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨  b^{10, 5}_2
c    -b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_1
c    -b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨  b^{10, 5}_0
c  in DIMACS:
-11045 -11046  11047 -40  11048 0
-11045 -11046  11047 -40 -11049 0
-11045 -11046  11047 -40  11050 0

c  -1+1 --> 0
c    ( b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0 ∧  p_40) -> (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧ -b^{10, 5}_0)
c  in CNF:
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_2
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_1
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_0
c  in DIMACS:
-11045  11046 -11047 -40 -11048 0
-11045  11046 -11047 -40 -11049 0
-11045  11046 -11047 -40 -11050 0

c  0+1 --> 1
c    (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧  p_40) -> (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0)
c  in CNF:
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_2
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_1
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨  b^{10, 5}_0
c  in DIMACS:
 11045  11046  11047 -40 -11048 0
 11045  11046  11047 -40 -11049 0
 11045  11046  11047 -40  11050 0

c  1+1 --> 2
c    (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0 ∧  p_40) -> (-b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0)
c  in CNF:
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_2
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨  b^{10, 5}_1
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ -p_40 ∨ -b^{10, 5}_0
c  in DIMACS:
 11045  11046 -11047 -40 -11048 0
 11045  11046 -11047 -40  11049 0
 11045  11046 -11047 -40 -11050 0

c  2+1 --> break 
c    (-b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧  p_40) -> break
c  in CNF:
c     b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 11045 -11046  11047 -40 1162 0


c  2-1 --> 1
c    (-b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧ -p_40) -> (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0)
c  in CNF:
c     b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_2
c     b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_1
c     b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨  b^{10, 5}_0
c  in DIMACS:
 11045 -11046  11047  40 -11048 0
 11045 -11046  11047  40 -11049 0
 11045 -11046  11047  40  11050 0

c  1-1 --> 0
c    (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0 ∧ -p_40) -> (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧ -b^{10, 5}_0)
c  in CNF:
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_2
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_1
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_0
c  in DIMACS:
 11045  11046 -11047  40 -11048 0
 11045  11046 -11047  40 -11049 0
 11045  11046 -11047  40 -11050 0

c  0-1 --> -1
c    (-b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧ -p_40) -> ( b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0)
c  in CNF:
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨  b^{10, 5}_2
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_1
c     b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨  b^{10, 5}_0
c  in DIMACS:
 11045  11046  11047  40  11048 0
 11045  11046  11047  40 -11049 0
 11045  11046  11047  40  11050 0

c  -1-1 --> -2
c    ( b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧  b^{10, 4}_0 ∧ -p_40) -> ( b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0)
c  in CNF:
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨  b^{10, 5}_2
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨  b^{10, 5}_1
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨  p_40 ∨ -b^{10, 5}_0
c  in DIMACS:
-11045  11046 -11047  40  11048 0
-11045  11046 -11047  40  11049 0
-11045  11046 -11047  40 -11050 0

c  -2-1 --> break 
c    ( b^{10, 4}_2 ∧  b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨  b^{10, 4}_0 ∨  p_40 ∨ break
c  in DIMACS:
-11045 -11046  11047  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 4}_2 ∧ -b^{10, 4}_1 ∧ -b^{10, 4}_0 ∧ true) 
c  in CNF:
c    -b^{10, 4}_2 ∨  b^{10, 4}_1 ∨  b^{10, 4}_0 ∨ false 
c  in DIMACS:
-11045  11046  11047  0

c  3 does not represent an automaton state.
c    -(-b^{10, 4}_2 ∧  b^{10, 4}_1 ∧  b^{10, 4}_0 ∧ true) 
c  in CNF:
c     b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ false 
c  in DIMACS:
 11045 -11046 -11047  0
c  -3 does not represent an automaton state.
c    -( b^{10, 4}_2 ∧  b^{10, 4}_1 ∧  b^{10, 4}_0 ∧ true) 
c  in CNF:
c    -b^{10, 4}_2 ∨ -b^{10, 4}_1 ∨ -b^{10, 4}_0 ∨ false 
c  in DIMACS:
-11045 -11046 -11047  0

c i = 5
c  -2+1 --> -1
c    ( b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧  p_50) -> ( b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0)
c  in CNF:
c    -b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨  b^{10, 6}_2
c    -b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_1
c    -b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨  b^{10, 6}_0
c  in DIMACS:
-11048 -11049  11050 -50  11051 0
-11048 -11049  11050 -50 -11052 0
-11048 -11049  11050 -50  11053 0

c  -1+1 --> 0
c    ( b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0 ∧  p_50) -> (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧ -b^{10, 6}_0)
c  in CNF:
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_2
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_1
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_0
c  in DIMACS:
-11048  11049 -11050 -50 -11051 0
-11048  11049 -11050 -50 -11052 0
-11048  11049 -11050 -50 -11053 0

c  0+1 --> 1
c    (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧  p_50) -> (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0)
c  in CNF:
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_2
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_1
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨  b^{10, 6}_0
c  in DIMACS:
 11048  11049  11050 -50 -11051 0
 11048  11049  11050 -50 -11052 0
 11048  11049  11050 -50  11053 0

c  1+1 --> 2
c    (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0 ∧  p_50) -> (-b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0)
c  in CNF:
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_2
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨  b^{10, 6}_1
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ -p_50 ∨ -b^{10, 6}_0
c  in DIMACS:
 11048  11049 -11050 -50 -11051 0
 11048  11049 -11050 -50  11052 0
 11048  11049 -11050 -50 -11053 0

c  2+1 --> break 
c    (-b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧  p_50) -> break
c  in CNF:
c     b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 11048 -11049  11050 -50 1162 0


c  2-1 --> 1
c    (-b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧ -p_50) -> (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0)
c  in CNF:
c     b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_2
c     b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_1
c     b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨  b^{10, 6}_0
c  in DIMACS:
 11048 -11049  11050  50 -11051 0
 11048 -11049  11050  50 -11052 0
 11048 -11049  11050  50  11053 0

c  1-1 --> 0
c    (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0 ∧ -p_50) -> (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧ -b^{10, 6}_0)
c  in CNF:
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_2
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_1
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_0
c  in DIMACS:
 11048  11049 -11050  50 -11051 0
 11048  11049 -11050  50 -11052 0
 11048  11049 -11050  50 -11053 0

c  0-1 --> -1
c    (-b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧ -p_50) -> ( b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0)
c  in CNF:
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨  b^{10, 6}_2
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_1
c     b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨  b^{10, 6}_0
c  in DIMACS:
 11048  11049  11050  50  11051 0
 11048  11049  11050  50 -11052 0
 11048  11049  11050  50  11053 0

c  -1-1 --> -2
c    ( b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧  b^{10, 5}_0 ∧ -p_50) -> ( b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0)
c  in CNF:
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨  b^{10, 6}_2
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨  b^{10, 6}_1
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨  p_50 ∨ -b^{10, 6}_0
c  in DIMACS:
-11048  11049 -11050  50  11051 0
-11048  11049 -11050  50  11052 0
-11048  11049 -11050  50 -11053 0

c  -2-1 --> break 
c    ( b^{10, 5}_2 ∧  b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨  b^{10, 5}_0 ∨  p_50 ∨ break
c  in DIMACS:
-11048 -11049  11050  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 5}_2 ∧ -b^{10, 5}_1 ∧ -b^{10, 5}_0 ∧ true) 
c  in CNF:
c    -b^{10, 5}_2 ∨  b^{10, 5}_1 ∨  b^{10, 5}_0 ∨ false 
c  in DIMACS:
-11048  11049  11050  0

c  3 does not represent an automaton state.
c    -(-b^{10, 5}_2 ∧  b^{10, 5}_1 ∧  b^{10, 5}_0 ∧ true) 
c  in CNF:
c     b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ false 
c  in DIMACS:
 11048 -11049 -11050  0
c  -3 does not represent an automaton state.
c    -( b^{10, 5}_2 ∧  b^{10, 5}_1 ∧  b^{10, 5}_0 ∧ true) 
c  in CNF:
c    -b^{10, 5}_2 ∨ -b^{10, 5}_1 ∨ -b^{10, 5}_0 ∨ false 
c  in DIMACS:
-11048 -11049 -11050  0

c i = 6
c  -2+1 --> -1
c    ( b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧  p_60) -> ( b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0)
c  in CNF:
c    -b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨  b^{10, 7}_2
c    -b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_1
c    -b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨  b^{10, 7}_0
c  in DIMACS:
-11051 -11052  11053 -60  11054 0
-11051 -11052  11053 -60 -11055 0
-11051 -11052  11053 -60  11056 0

c  -1+1 --> 0
c    ( b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0 ∧  p_60) -> (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧ -b^{10, 7}_0)
c  in CNF:
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_2
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_1
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_0
c  in DIMACS:
-11051  11052 -11053 -60 -11054 0
-11051  11052 -11053 -60 -11055 0
-11051  11052 -11053 -60 -11056 0

c  0+1 --> 1
c    (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧  p_60) -> (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0)
c  in CNF:
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_2
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_1
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨  b^{10, 7}_0
c  in DIMACS:
 11051  11052  11053 -60 -11054 0
 11051  11052  11053 -60 -11055 0
 11051  11052  11053 -60  11056 0

c  1+1 --> 2
c    (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0 ∧  p_60) -> (-b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0)
c  in CNF:
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_2
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨  b^{10, 7}_1
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ -p_60 ∨ -b^{10, 7}_0
c  in DIMACS:
 11051  11052 -11053 -60 -11054 0
 11051  11052 -11053 -60  11055 0
 11051  11052 -11053 -60 -11056 0

c  2+1 --> break 
c    (-b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧  p_60) -> break
c  in CNF:
c     b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 11051 -11052  11053 -60 1162 0


c  2-1 --> 1
c    (-b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧ -p_60) -> (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0)
c  in CNF:
c     b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_2
c     b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_1
c     b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨  b^{10, 7}_0
c  in DIMACS:
 11051 -11052  11053  60 -11054 0
 11051 -11052  11053  60 -11055 0
 11051 -11052  11053  60  11056 0

c  1-1 --> 0
c    (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0 ∧ -p_60) -> (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧ -b^{10, 7}_0)
c  in CNF:
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_2
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_1
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_0
c  in DIMACS:
 11051  11052 -11053  60 -11054 0
 11051  11052 -11053  60 -11055 0
 11051  11052 -11053  60 -11056 0

c  0-1 --> -1
c    (-b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧ -p_60) -> ( b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0)
c  in CNF:
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨  b^{10, 7}_2
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_1
c     b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨  b^{10, 7}_0
c  in DIMACS:
 11051  11052  11053  60  11054 0
 11051  11052  11053  60 -11055 0
 11051  11052  11053  60  11056 0

c  -1-1 --> -2
c    ( b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧  b^{10, 6}_0 ∧ -p_60) -> ( b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0)
c  in CNF:
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨  b^{10, 7}_2
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨  b^{10, 7}_1
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨  p_60 ∨ -b^{10, 7}_0
c  in DIMACS:
-11051  11052 -11053  60  11054 0
-11051  11052 -11053  60  11055 0
-11051  11052 -11053  60 -11056 0

c  -2-1 --> break 
c    ( b^{10, 6}_2 ∧  b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨  b^{10, 6}_0 ∨  p_60 ∨ break
c  in DIMACS:
-11051 -11052  11053  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 6}_2 ∧ -b^{10, 6}_1 ∧ -b^{10, 6}_0 ∧ true) 
c  in CNF:
c    -b^{10, 6}_2 ∨  b^{10, 6}_1 ∨  b^{10, 6}_0 ∨ false 
c  in DIMACS:
-11051  11052  11053  0

c  3 does not represent an automaton state.
c    -(-b^{10, 6}_2 ∧  b^{10, 6}_1 ∧  b^{10, 6}_0 ∧ true) 
c  in CNF:
c     b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ false 
c  in DIMACS:
 11051 -11052 -11053  0
c  -3 does not represent an automaton state.
c    -( b^{10, 6}_2 ∧  b^{10, 6}_1 ∧  b^{10, 6}_0 ∧ true) 
c  in CNF:
c    -b^{10, 6}_2 ∨ -b^{10, 6}_1 ∨ -b^{10, 6}_0 ∨ false 
c  in DIMACS:
-11051 -11052 -11053  0

c i = 7
c  -2+1 --> -1
c    ( b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧  p_70) -> ( b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0)
c  in CNF:
c    -b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨  b^{10, 8}_2
c    -b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_1
c    -b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨  b^{10, 8}_0
c  in DIMACS:
-11054 -11055  11056 -70  11057 0
-11054 -11055  11056 -70 -11058 0
-11054 -11055  11056 -70  11059 0

c  -1+1 --> 0
c    ( b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0 ∧  p_70) -> (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧ -b^{10, 8}_0)
c  in CNF:
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_2
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_1
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_0
c  in DIMACS:
-11054  11055 -11056 -70 -11057 0
-11054  11055 -11056 -70 -11058 0
-11054  11055 -11056 -70 -11059 0

c  0+1 --> 1
c    (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧  p_70) -> (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0)
c  in CNF:
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_2
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_1
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨  b^{10, 8}_0
c  in DIMACS:
 11054  11055  11056 -70 -11057 0
 11054  11055  11056 -70 -11058 0
 11054  11055  11056 -70  11059 0

c  1+1 --> 2
c    (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0 ∧  p_70) -> (-b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0)
c  in CNF:
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_2
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨  b^{10, 8}_1
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ -p_70 ∨ -b^{10, 8}_0
c  in DIMACS:
 11054  11055 -11056 -70 -11057 0
 11054  11055 -11056 -70  11058 0
 11054  11055 -11056 -70 -11059 0

c  2+1 --> break 
c    (-b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧  p_70) -> break
c  in CNF:
c     b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 11054 -11055  11056 -70 1162 0


c  2-1 --> 1
c    (-b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧ -p_70) -> (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0)
c  in CNF:
c     b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_2
c     b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_1
c     b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨  b^{10, 8}_0
c  in DIMACS:
 11054 -11055  11056  70 -11057 0
 11054 -11055  11056  70 -11058 0
 11054 -11055  11056  70  11059 0

c  1-1 --> 0
c    (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0 ∧ -p_70) -> (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧ -b^{10, 8}_0)
c  in CNF:
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_2
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_1
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_0
c  in DIMACS:
 11054  11055 -11056  70 -11057 0
 11054  11055 -11056  70 -11058 0
 11054  11055 -11056  70 -11059 0

c  0-1 --> -1
c    (-b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧ -p_70) -> ( b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0)
c  in CNF:
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨  b^{10, 8}_2
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_1
c     b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨  b^{10, 8}_0
c  in DIMACS:
 11054  11055  11056  70  11057 0
 11054  11055  11056  70 -11058 0
 11054  11055  11056  70  11059 0

c  -1-1 --> -2
c    ( b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧  b^{10, 7}_0 ∧ -p_70) -> ( b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0)
c  in CNF:
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨  b^{10, 8}_2
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨  b^{10, 8}_1
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨  p_70 ∨ -b^{10, 8}_0
c  in DIMACS:
-11054  11055 -11056  70  11057 0
-11054  11055 -11056  70  11058 0
-11054  11055 -11056  70 -11059 0

c  -2-1 --> break 
c    ( b^{10, 7}_2 ∧  b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨  b^{10, 7}_0 ∨  p_70 ∨ break
c  in DIMACS:
-11054 -11055  11056  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 7}_2 ∧ -b^{10, 7}_1 ∧ -b^{10, 7}_0 ∧ true) 
c  in CNF:
c    -b^{10, 7}_2 ∨  b^{10, 7}_1 ∨  b^{10, 7}_0 ∨ false 
c  in DIMACS:
-11054  11055  11056  0

c  3 does not represent an automaton state.
c    -(-b^{10, 7}_2 ∧  b^{10, 7}_1 ∧  b^{10, 7}_0 ∧ true) 
c  in CNF:
c     b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ false 
c  in DIMACS:
 11054 -11055 -11056  0
c  -3 does not represent an automaton state.
c    -( b^{10, 7}_2 ∧  b^{10, 7}_1 ∧  b^{10, 7}_0 ∧ true) 
c  in CNF:
c    -b^{10, 7}_2 ∨ -b^{10, 7}_1 ∨ -b^{10, 7}_0 ∨ false 
c  in DIMACS:
-11054 -11055 -11056  0

c i = 8
c  -2+1 --> -1
c    ( b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧  p_80) -> ( b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0)
c  in CNF:
c    -b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨  b^{10, 9}_2
c    -b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_1
c    -b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨  b^{10, 9}_0
c  in DIMACS:
-11057 -11058  11059 -80  11060 0
-11057 -11058  11059 -80 -11061 0
-11057 -11058  11059 -80  11062 0

c  -1+1 --> 0
c    ( b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0 ∧  p_80) -> (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧ -b^{10, 9}_0)
c  in CNF:
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_2
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_1
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_0
c  in DIMACS:
-11057  11058 -11059 -80 -11060 0
-11057  11058 -11059 -80 -11061 0
-11057  11058 -11059 -80 -11062 0

c  0+1 --> 1
c    (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧  p_80) -> (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0)
c  in CNF:
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_2
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_1
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨  b^{10, 9}_0
c  in DIMACS:
 11057  11058  11059 -80 -11060 0
 11057  11058  11059 -80 -11061 0
 11057  11058  11059 -80  11062 0

c  1+1 --> 2
c    (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0 ∧  p_80) -> (-b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0)
c  in CNF:
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_2
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨  b^{10, 9}_1
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ -p_80 ∨ -b^{10, 9}_0
c  in DIMACS:
 11057  11058 -11059 -80 -11060 0
 11057  11058 -11059 -80  11061 0
 11057  11058 -11059 -80 -11062 0

c  2+1 --> break 
c    (-b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧  p_80) -> break
c  in CNF:
c     b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 11057 -11058  11059 -80 1162 0


c  2-1 --> 1
c    (-b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧ -p_80) -> (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0)
c  in CNF:
c     b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_2
c     b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_1
c     b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨  b^{10, 9}_0
c  in DIMACS:
 11057 -11058  11059  80 -11060 0
 11057 -11058  11059  80 -11061 0
 11057 -11058  11059  80  11062 0

c  1-1 --> 0
c    (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0 ∧ -p_80) -> (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧ -b^{10, 9}_0)
c  in CNF:
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_2
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_1
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_0
c  in DIMACS:
 11057  11058 -11059  80 -11060 0
 11057  11058 -11059  80 -11061 0
 11057  11058 -11059  80 -11062 0

c  0-1 --> -1
c    (-b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧ -p_80) -> ( b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0)
c  in CNF:
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨  b^{10, 9}_2
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_1
c     b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨  b^{10, 9}_0
c  in DIMACS:
 11057  11058  11059  80  11060 0
 11057  11058  11059  80 -11061 0
 11057  11058  11059  80  11062 0

c  -1-1 --> -2
c    ( b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧  b^{10, 8}_0 ∧ -p_80) -> ( b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0)
c  in CNF:
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨  b^{10, 9}_2
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨  b^{10, 9}_1
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨  p_80 ∨ -b^{10, 9}_0
c  in DIMACS:
-11057  11058 -11059  80  11060 0
-11057  11058 -11059  80  11061 0
-11057  11058 -11059  80 -11062 0

c  -2-1 --> break 
c    ( b^{10, 8}_2 ∧  b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨  b^{10, 8}_0 ∨  p_80 ∨ break
c  in DIMACS:
-11057 -11058  11059  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 8}_2 ∧ -b^{10, 8}_1 ∧ -b^{10, 8}_0 ∧ true) 
c  in CNF:
c    -b^{10, 8}_2 ∨  b^{10, 8}_1 ∨  b^{10, 8}_0 ∨ false 
c  in DIMACS:
-11057  11058  11059  0

c  3 does not represent an automaton state.
c    -(-b^{10, 8}_2 ∧  b^{10, 8}_1 ∧  b^{10, 8}_0 ∧ true) 
c  in CNF:
c     b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ false 
c  in DIMACS:
 11057 -11058 -11059  0
c  -3 does not represent an automaton state.
c    -( b^{10, 8}_2 ∧  b^{10, 8}_1 ∧  b^{10, 8}_0 ∧ true) 
c  in CNF:
c    -b^{10, 8}_2 ∨ -b^{10, 8}_1 ∨ -b^{10, 8}_0 ∨ false 
c  in DIMACS:
-11057 -11058 -11059  0

c i = 9
c  -2+1 --> -1
c    ( b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧  p_90) -> ( b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0)
c  in CNF:
c    -b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨  b^{10, 10}_2
c    -b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_1
c    -b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨  b^{10, 10}_0
c  in DIMACS:
-11060 -11061  11062 -90  11063 0
-11060 -11061  11062 -90 -11064 0
-11060 -11061  11062 -90  11065 0

c  -1+1 --> 0
c    ( b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0 ∧  p_90) -> (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧ -b^{10, 10}_0)
c  in CNF:
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_2
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_1
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_0
c  in DIMACS:
-11060  11061 -11062 -90 -11063 0
-11060  11061 -11062 -90 -11064 0
-11060  11061 -11062 -90 -11065 0

c  0+1 --> 1
c    (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧  p_90) -> (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0)
c  in CNF:
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_2
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_1
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨  b^{10, 10}_0
c  in DIMACS:
 11060  11061  11062 -90 -11063 0
 11060  11061  11062 -90 -11064 0
 11060  11061  11062 -90  11065 0

c  1+1 --> 2
c    (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0 ∧  p_90) -> (-b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0)
c  in CNF:
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_2
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨  b^{10, 10}_1
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ -p_90 ∨ -b^{10, 10}_0
c  in DIMACS:
 11060  11061 -11062 -90 -11063 0
 11060  11061 -11062 -90  11064 0
 11060  11061 -11062 -90 -11065 0

c  2+1 --> break 
c    (-b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧  p_90) -> break
c  in CNF:
c     b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 11060 -11061  11062 -90 1162 0


c  2-1 --> 1
c    (-b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧ -p_90) -> (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0)
c  in CNF:
c     b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_2
c     b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_1
c     b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨  b^{10, 10}_0
c  in DIMACS:
 11060 -11061  11062  90 -11063 0
 11060 -11061  11062  90 -11064 0
 11060 -11061  11062  90  11065 0

c  1-1 --> 0
c    (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0 ∧ -p_90) -> (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧ -b^{10, 10}_0)
c  in CNF:
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_2
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_1
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_0
c  in DIMACS:
 11060  11061 -11062  90 -11063 0
 11060  11061 -11062  90 -11064 0
 11060  11061 -11062  90 -11065 0

c  0-1 --> -1
c    (-b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧ -p_90) -> ( b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0)
c  in CNF:
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨  b^{10, 10}_2
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_1
c     b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨  b^{10, 10}_0
c  in DIMACS:
 11060  11061  11062  90  11063 0
 11060  11061  11062  90 -11064 0
 11060  11061  11062  90  11065 0

c  -1-1 --> -2
c    ( b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧  b^{10, 9}_0 ∧ -p_90) -> ( b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0)
c  in CNF:
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨  b^{10, 10}_2
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨  b^{10, 10}_1
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨  p_90 ∨ -b^{10, 10}_0
c  in DIMACS:
-11060  11061 -11062  90  11063 0
-11060  11061 -11062  90  11064 0
-11060  11061 -11062  90 -11065 0

c  -2-1 --> break 
c    ( b^{10, 9}_2 ∧  b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨  b^{10, 9}_0 ∨  p_90 ∨ break
c  in DIMACS:
-11060 -11061  11062  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 9}_2 ∧ -b^{10, 9}_1 ∧ -b^{10, 9}_0 ∧ true) 
c  in CNF:
c    -b^{10, 9}_2 ∨  b^{10, 9}_1 ∨  b^{10, 9}_0 ∨ false 
c  in DIMACS:
-11060  11061  11062  0

c  3 does not represent an automaton state.
c    -(-b^{10, 9}_2 ∧  b^{10, 9}_1 ∧  b^{10, 9}_0 ∧ true) 
c  in CNF:
c     b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ false 
c  in DIMACS:
 11060 -11061 -11062  0
c  -3 does not represent an automaton state.
c    -( b^{10, 9}_2 ∧  b^{10, 9}_1 ∧  b^{10, 9}_0 ∧ true) 
c  in CNF:
c    -b^{10, 9}_2 ∨ -b^{10, 9}_1 ∨ -b^{10, 9}_0 ∨ false 
c  in DIMACS:
-11060 -11061 -11062  0

c i = 10
c  -2+1 --> -1
c    ( b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧  p_100) -> ( b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0)
c  in CNF:
c    -b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨  b^{10, 11}_2
c    -b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_1
c    -b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨  b^{10, 11}_0
c  in DIMACS:
-11063 -11064  11065 -100  11066 0
-11063 -11064  11065 -100 -11067 0
-11063 -11064  11065 -100  11068 0

c  -1+1 --> 0
c    ( b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0 ∧  p_100) -> (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧ -b^{10, 11}_0)
c  in CNF:
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_2
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_1
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_0
c  in DIMACS:
-11063  11064 -11065 -100 -11066 0
-11063  11064 -11065 -100 -11067 0
-11063  11064 -11065 -100 -11068 0

c  0+1 --> 1
c    (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧  p_100) -> (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0)
c  in CNF:
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_2
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_1
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨  b^{10, 11}_0
c  in DIMACS:
 11063  11064  11065 -100 -11066 0
 11063  11064  11065 -100 -11067 0
 11063  11064  11065 -100  11068 0

c  1+1 --> 2
c    (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0 ∧  p_100) -> (-b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0)
c  in CNF:
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_2
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨  b^{10, 11}_1
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ -p_100 ∨ -b^{10, 11}_0
c  in DIMACS:
 11063  11064 -11065 -100 -11066 0
 11063  11064 -11065 -100  11067 0
 11063  11064 -11065 -100 -11068 0

c  2+1 --> break 
c    (-b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧  p_100) -> break
c  in CNF:
c     b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 11063 -11064  11065 -100 1162 0


c  2-1 --> 1
c    (-b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧ -p_100) -> (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0)
c  in CNF:
c     b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_2
c     b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_1
c     b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨  b^{10, 11}_0
c  in DIMACS:
 11063 -11064  11065  100 -11066 0
 11063 -11064  11065  100 -11067 0
 11063 -11064  11065  100  11068 0

c  1-1 --> 0
c    (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0 ∧ -p_100) -> (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧ -b^{10, 11}_0)
c  in CNF:
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_2
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_1
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_0
c  in DIMACS:
 11063  11064 -11065  100 -11066 0
 11063  11064 -11065  100 -11067 0
 11063  11064 -11065  100 -11068 0

c  0-1 --> -1
c    (-b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧ -p_100) -> ( b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0)
c  in CNF:
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨  b^{10, 11}_2
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_1
c     b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨  b^{10, 11}_0
c  in DIMACS:
 11063  11064  11065  100  11066 0
 11063  11064  11065  100 -11067 0
 11063  11064  11065  100  11068 0

c  -1-1 --> -2
c    ( b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧  b^{10, 10}_0 ∧ -p_100) -> ( b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0)
c  in CNF:
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨  b^{10, 11}_2
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨  b^{10, 11}_1
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨  p_100 ∨ -b^{10, 11}_0
c  in DIMACS:
-11063  11064 -11065  100  11066 0
-11063  11064 -11065  100  11067 0
-11063  11064 -11065  100 -11068 0

c  -2-1 --> break 
c    ( b^{10, 10}_2 ∧  b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨  b^{10, 10}_0 ∨  p_100 ∨ break
c  in DIMACS:
-11063 -11064  11065  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 10}_2 ∧ -b^{10, 10}_1 ∧ -b^{10, 10}_0 ∧ true) 
c  in CNF:
c    -b^{10, 10}_2 ∨  b^{10, 10}_1 ∨  b^{10, 10}_0 ∨ false 
c  in DIMACS:
-11063  11064  11065  0

c  3 does not represent an automaton state.
c    -(-b^{10, 10}_2 ∧  b^{10, 10}_1 ∧  b^{10, 10}_0 ∧ true) 
c  in CNF:
c     b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ false 
c  in DIMACS:
 11063 -11064 -11065  0
c  -3 does not represent an automaton state.
c    -( b^{10, 10}_2 ∧  b^{10, 10}_1 ∧  b^{10, 10}_0 ∧ true) 
c  in CNF:
c    -b^{10, 10}_2 ∨ -b^{10, 10}_1 ∨ -b^{10, 10}_0 ∨ false 
c  in DIMACS:
-11063 -11064 -11065  0

c i = 11
c  -2+1 --> -1
c    ( b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧  p_110) -> ( b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0)
c  in CNF:
c    -b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨  b^{10, 12}_2
c    -b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_1
c    -b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨  b^{10, 12}_0
c  in DIMACS:
-11066 -11067  11068 -110  11069 0
-11066 -11067  11068 -110 -11070 0
-11066 -11067  11068 -110  11071 0

c  -1+1 --> 0
c    ( b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0 ∧  p_110) -> (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧ -b^{10, 12}_0)
c  in CNF:
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_2
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_1
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_0
c  in DIMACS:
-11066  11067 -11068 -110 -11069 0
-11066  11067 -11068 -110 -11070 0
-11066  11067 -11068 -110 -11071 0

c  0+1 --> 1
c    (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧  p_110) -> (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0)
c  in CNF:
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_2
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_1
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨  b^{10, 12}_0
c  in DIMACS:
 11066  11067  11068 -110 -11069 0
 11066  11067  11068 -110 -11070 0
 11066  11067  11068 -110  11071 0

c  1+1 --> 2
c    (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0 ∧  p_110) -> (-b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0)
c  in CNF:
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_2
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨  b^{10, 12}_1
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ -p_110 ∨ -b^{10, 12}_0
c  in DIMACS:
 11066  11067 -11068 -110 -11069 0
 11066  11067 -11068 -110  11070 0
 11066  11067 -11068 -110 -11071 0

c  2+1 --> break 
c    (-b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧  p_110) -> break
c  in CNF:
c     b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 11066 -11067  11068 -110 1162 0


c  2-1 --> 1
c    (-b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧ -p_110) -> (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0)
c  in CNF:
c     b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_2
c     b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_1
c     b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨  b^{10, 12}_0
c  in DIMACS:
 11066 -11067  11068  110 -11069 0
 11066 -11067  11068  110 -11070 0
 11066 -11067  11068  110  11071 0

c  1-1 --> 0
c    (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0 ∧ -p_110) -> (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧ -b^{10, 12}_0)
c  in CNF:
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_2
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_1
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_0
c  in DIMACS:
 11066  11067 -11068  110 -11069 0
 11066  11067 -11068  110 -11070 0
 11066  11067 -11068  110 -11071 0

c  0-1 --> -1
c    (-b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧ -p_110) -> ( b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0)
c  in CNF:
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨  b^{10, 12}_2
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_1
c     b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨  b^{10, 12}_0
c  in DIMACS:
 11066  11067  11068  110  11069 0
 11066  11067  11068  110 -11070 0
 11066  11067  11068  110  11071 0

c  -1-1 --> -2
c    ( b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧  b^{10, 11}_0 ∧ -p_110) -> ( b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0)
c  in CNF:
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨  b^{10, 12}_2
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨  b^{10, 12}_1
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨  p_110 ∨ -b^{10, 12}_0
c  in DIMACS:
-11066  11067 -11068  110  11069 0
-11066  11067 -11068  110  11070 0
-11066  11067 -11068  110 -11071 0

c  -2-1 --> break 
c    ( b^{10, 11}_2 ∧  b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨  b^{10, 11}_0 ∨  p_110 ∨ break
c  in DIMACS:
-11066 -11067  11068  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 11}_2 ∧ -b^{10, 11}_1 ∧ -b^{10, 11}_0 ∧ true) 
c  in CNF:
c    -b^{10, 11}_2 ∨  b^{10, 11}_1 ∨  b^{10, 11}_0 ∨ false 
c  in DIMACS:
-11066  11067  11068  0

c  3 does not represent an automaton state.
c    -(-b^{10, 11}_2 ∧  b^{10, 11}_1 ∧  b^{10, 11}_0 ∧ true) 
c  in CNF:
c     b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ false 
c  in DIMACS:
 11066 -11067 -11068  0
c  -3 does not represent an automaton state.
c    -( b^{10, 11}_2 ∧  b^{10, 11}_1 ∧  b^{10, 11}_0 ∧ true) 
c  in CNF:
c    -b^{10, 11}_2 ∨ -b^{10, 11}_1 ∨ -b^{10, 11}_0 ∨ false 
c  in DIMACS:
-11066 -11067 -11068  0

c i = 12
c  -2+1 --> -1
c    ( b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧  p_120) -> ( b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0)
c  in CNF:
c    -b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨  b^{10, 13}_2
c    -b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_1
c    -b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨  b^{10, 13}_0
c  in DIMACS:
-11069 -11070  11071 -120  11072 0
-11069 -11070  11071 -120 -11073 0
-11069 -11070  11071 -120  11074 0

c  -1+1 --> 0
c    ( b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0 ∧  p_120) -> (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧ -b^{10, 13}_0)
c  in CNF:
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_2
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_1
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_0
c  in DIMACS:
-11069  11070 -11071 -120 -11072 0
-11069  11070 -11071 -120 -11073 0
-11069  11070 -11071 -120 -11074 0

c  0+1 --> 1
c    (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧  p_120) -> (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0)
c  in CNF:
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_2
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_1
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨  b^{10, 13}_0
c  in DIMACS:
 11069  11070  11071 -120 -11072 0
 11069  11070  11071 -120 -11073 0
 11069  11070  11071 -120  11074 0

c  1+1 --> 2
c    (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0 ∧  p_120) -> (-b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0)
c  in CNF:
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_2
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨  b^{10, 13}_1
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ -p_120 ∨ -b^{10, 13}_0
c  in DIMACS:
 11069  11070 -11071 -120 -11072 0
 11069  11070 -11071 -120  11073 0
 11069  11070 -11071 -120 -11074 0

c  2+1 --> break 
c    (-b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧  p_120) -> break
c  in CNF:
c     b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 11069 -11070  11071 -120 1162 0


c  2-1 --> 1
c    (-b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧ -p_120) -> (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0)
c  in CNF:
c     b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_2
c     b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_1
c     b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨  b^{10, 13}_0
c  in DIMACS:
 11069 -11070  11071  120 -11072 0
 11069 -11070  11071  120 -11073 0
 11069 -11070  11071  120  11074 0

c  1-1 --> 0
c    (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0 ∧ -p_120) -> (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧ -b^{10, 13}_0)
c  in CNF:
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_2
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_1
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_0
c  in DIMACS:
 11069  11070 -11071  120 -11072 0
 11069  11070 -11071  120 -11073 0
 11069  11070 -11071  120 -11074 0

c  0-1 --> -1
c    (-b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧ -p_120) -> ( b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0)
c  in CNF:
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨  b^{10, 13}_2
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_1
c     b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨  b^{10, 13}_0
c  in DIMACS:
 11069  11070  11071  120  11072 0
 11069  11070  11071  120 -11073 0
 11069  11070  11071  120  11074 0

c  -1-1 --> -2
c    ( b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧  b^{10, 12}_0 ∧ -p_120) -> ( b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0)
c  in CNF:
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨  b^{10, 13}_2
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨  b^{10, 13}_1
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨  p_120 ∨ -b^{10, 13}_0
c  in DIMACS:
-11069  11070 -11071  120  11072 0
-11069  11070 -11071  120  11073 0
-11069  11070 -11071  120 -11074 0

c  -2-1 --> break 
c    ( b^{10, 12}_2 ∧  b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨  b^{10, 12}_0 ∨  p_120 ∨ break
c  in DIMACS:
-11069 -11070  11071  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 12}_2 ∧ -b^{10, 12}_1 ∧ -b^{10, 12}_0 ∧ true) 
c  in CNF:
c    -b^{10, 12}_2 ∨  b^{10, 12}_1 ∨  b^{10, 12}_0 ∨ false 
c  in DIMACS:
-11069  11070  11071  0

c  3 does not represent an automaton state.
c    -(-b^{10, 12}_2 ∧  b^{10, 12}_1 ∧  b^{10, 12}_0 ∧ true) 
c  in CNF:
c     b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ false 
c  in DIMACS:
 11069 -11070 -11071  0
c  -3 does not represent an automaton state.
c    -( b^{10, 12}_2 ∧  b^{10, 12}_1 ∧  b^{10, 12}_0 ∧ true) 
c  in CNF:
c    -b^{10, 12}_2 ∨ -b^{10, 12}_1 ∨ -b^{10, 12}_0 ∨ false 
c  in DIMACS:
-11069 -11070 -11071  0

c i = 13
c  -2+1 --> -1
c    ( b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧  p_130) -> ( b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0)
c  in CNF:
c    -b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨  b^{10, 14}_2
c    -b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_1
c    -b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨  b^{10, 14}_0
c  in DIMACS:
-11072 -11073  11074 -130  11075 0
-11072 -11073  11074 -130 -11076 0
-11072 -11073  11074 -130  11077 0

c  -1+1 --> 0
c    ( b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0 ∧  p_130) -> (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧ -b^{10, 14}_0)
c  in CNF:
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_2
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_1
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_0
c  in DIMACS:
-11072  11073 -11074 -130 -11075 0
-11072  11073 -11074 -130 -11076 0
-11072  11073 -11074 -130 -11077 0

c  0+1 --> 1
c    (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧  p_130) -> (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0)
c  in CNF:
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_2
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_1
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨  b^{10, 14}_0
c  in DIMACS:
 11072  11073  11074 -130 -11075 0
 11072  11073  11074 -130 -11076 0
 11072  11073  11074 -130  11077 0

c  1+1 --> 2
c    (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0 ∧  p_130) -> (-b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0)
c  in CNF:
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_2
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨  b^{10, 14}_1
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ -p_130 ∨ -b^{10, 14}_0
c  in DIMACS:
 11072  11073 -11074 -130 -11075 0
 11072  11073 -11074 -130  11076 0
 11072  11073 -11074 -130 -11077 0

c  2+1 --> break 
c    (-b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧  p_130) -> break
c  in CNF:
c     b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 11072 -11073  11074 -130 1162 0


c  2-1 --> 1
c    (-b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧ -p_130) -> (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0)
c  in CNF:
c     b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_2
c     b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_1
c     b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨  b^{10, 14}_0
c  in DIMACS:
 11072 -11073  11074  130 -11075 0
 11072 -11073  11074  130 -11076 0
 11072 -11073  11074  130  11077 0

c  1-1 --> 0
c    (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0 ∧ -p_130) -> (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧ -b^{10, 14}_0)
c  in CNF:
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_2
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_1
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_0
c  in DIMACS:
 11072  11073 -11074  130 -11075 0
 11072  11073 -11074  130 -11076 0
 11072  11073 -11074  130 -11077 0

c  0-1 --> -1
c    (-b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧ -p_130) -> ( b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0)
c  in CNF:
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨  b^{10, 14}_2
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_1
c     b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨  b^{10, 14}_0
c  in DIMACS:
 11072  11073  11074  130  11075 0
 11072  11073  11074  130 -11076 0
 11072  11073  11074  130  11077 0

c  -1-1 --> -2
c    ( b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧  b^{10, 13}_0 ∧ -p_130) -> ( b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0)
c  in CNF:
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨  b^{10, 14}_2
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨  b^{10, 14}_1
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨  p_130 ∨ -b^{10, 14}_0
c  in DIMACS:
-11072  11073 -11074  130  11075 0
-11072  11073 -11074  130  11076 0
-11072  11073 -11074  130 -11077 0

c  -2-1 --> break 
c    ( b^{10, 13}_2 ∧  b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨  b^{10, 13}_0 ∨  p_130 ∨ break
c  in DIMACS:
-11072 -11073  11074  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 13}_2 ∧ -b^{10, 13}_1 ∧ -b^{10, 13}_0 ∧ true) 
c  in CNF:
c    -b^{10, 13}_2 ∨  b^{10, 13}_1 ∨  b^{10, 13}_0 ∨ false 
c  in DIMACS:
-11072  11073  11074  0

c  3 does not represent an automaton state.
c    -(-b^{10, 13}_2 ∧  b^{10, 13}_1 ∧  b^{10, 13}_0 ∧ true) 
c  in CNF:
c     b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ false 
c  in DIMACS:
 11072 -11073 -11074  0
c  -3 does not represent an automaton state.
c    -( b^{10, 13}_2 ∧  b^{10, 13}_1 ∧  b^{10, 13}_0 ∧ true) 
c  in CNF:
c    -b^{10, 13}_2 ∨ -b^{10, 13}_1 ∨ -b^{10, 13}_0 ∨ false 
c  in DIMACS:
-11072 -11073 -11074  0

c i = 14
c  -2+1 --> -1
c    ( b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧  p_140) -> ( b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0)
c  in CNF:
c    -b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨  b^{10, 15}_2
c    -b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_1
c    -b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨  b^{10, 15}_0
c  in DIMACS:
-11075 -11076  11077 -140  11078 0
-11075 -11076  11077 -140 -11079 0
-11075 -11076  11077 -140  11080 0

c  -1+1 --> 0
c    ( b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0 ∧  p_140) -> (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧ -b^{10, 15}_0)
c  in CNF:
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_2
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_1
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_0
c  in DIMACS:
-11075  11076 -11077 -140 -11078 0
-11075  11076 -11077 -140 -11079 0
-11075  11076 -11077 -140 -11080 0

c  0+1 --> 1
c    (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧  p_140) -> (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0)
c  in CNF:
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_2
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_1
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨  b^{10, 15}_0
c  in DIMACS:
 11075  11076  11077 -140 -11078 0
 11075  11076  11077 -140 -11079 0
 11075  11076  11077 -140  11080 0

c  1+1 --> 2
c    (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0 ∧  p_140) -> (-b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0)
c  in CNF:
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_2
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨  b^{10, 15}_1
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ -p_140 ∨ -b^{10, 15}_0
c  in DIMACS:
 11075  11076 -11077 -140 -11078 0
 11075  11076 -11077 -140  11079 0
 11075  11076 -11077 -140 -11080 0

c  2+1 --> break 
c    (-b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧  p_140) -> break
c  in CNF:
c     b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 11075 -11076  11077 -140 1162 0


c  2-1 --> 1
c    (-b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧ -p_140) -> (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0)
c  in CNF:
c     b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_2
c     b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_1
c     b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨  b^{10, 15}_0
c  in DIMACS:
 11075 -11076  11077  140 -11078 0
 11075 -11076  11077  140 -11079 0
 11075 -11076  11077  140  11080 0

c  1-1 --> 0
c    (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0 ∧ -p_140) -> (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧ -b^{10, 15}_0)
c  in CNF:
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_2
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_1
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_0
c  in DIMACS:
 11075  11076 -11077  140 -11078 0
 11075  11076 -11077  140 -11079 0
 11075  11076 -11077  140 -11080 0

c  0-1 --> -1
c    (-b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧ -p_140) -> ( b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0)
c  in CNF:
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨  b^{10, 15}_2
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_1
c     b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨  b^{10, 15}_0
c  in DIMACS:
 11075  11076  11077  140  11078 0
 11075  11076  11077  140 -11079 0
 11075  11076  11077  140  11080 0

c  -1-1 --> -2
c    ( b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧  b^{10, 14}_0 ∧ -p_140) -> ( b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0)
c  in CNF:
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨  b^{10, 15}_2
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨  b^{10, 15}_1
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨  p_140 ∨ -b^{10, 15}_0
c  in DIMACS:
-11075  11076 -11077  140  11078 0
-11075  11076 -11077  140  11079 0
-11075  11076 -11077  140 -11080 0

c  -2-1 --> break 
c    ( b^{10, 14}_2 ∧  b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨  b^{10, 14}_0 ∨  p_140 ∨ break
c  in DIMACS:
-11075 -11076  11077  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 14}_2 ∧ -b^{10, 14}_1 ∧ -b^{10, 14}_0 ∧ true) 
c  in CNF:
c    -b^{10, 14}_2 ∨  b^{10, 14}_1 ∨  b^{10, 14}_0 ∨ false 
c  in DIMACS:
-11075  11076  11077  0

c  3 does not represent an automaton state.
c    -(-b^{10, 14}_2 ∧  b^{10, 14}_1 ∧  b^{10, 14}_0 ∧ true) 
c  in CNF:
c     b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ false 
c  in DIMACS:
 11075 -11076 -11077  0
c  -3 does not represent an automaton state.
c    -( b^{10, 14}_2 ∧  b^{10, 14}_1 ∧  b^{10, 14}_0 ∧ true) 
c  in CNF:
c    -b^{10, 14}_2 ∨ -b^{10, 14}_1 ∨ -b^{10, 14}_0 ∨ false 
c  in DIMACS:
-11075 -11076 -11077  0

c i = 15
c  -2+1 --> -1
c    ( b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧  p_150) -> ( b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0)
c  in CNF:
c    -b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨  b^{10, 16}_2
c    -b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_1
c    -b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨  b^{10, 16}_0
c  in DIMACS:
-11078 -11079  11080 -150  11081 0
-11078 -11079  11080 -150 -11082 0
-11078 -11079  11080 -150  11083 0

c  -1+1 --> 0
c    ( b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0 ∧  p_150) -> (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧ -b^{10, 16}_0)
c  in CNF:
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_2
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_1
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_0
c  in DIMACS:
-11078  11079 -11080 -150 -11081 0
-11078  11079 -11080 -150 -11082 0
-11078  11079 -11080 -150 -11083 0

c  0+1 --> 1
c    (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧  p_150) -> (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0)
c  in CNF:
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_2
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_1
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨  b^{10, 16}_0
c  in DIMACS:
 11078  11079  11080 -150 -11081 0
 11078  11079  11080 -150 -11082 0
 11078  11079  11080 -150  11083 0

c  1+1 --> 2
c    (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0 ∧  p_150) -> (-b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0)
c  in CNF:
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_2
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨  b^{10, 16}_1
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ -p_150 ∨ -b^{10, 16}_0
c  in DIMACS:
 11078  11079 -11080 -150 -11081 0
 11078  11079 -11080 -150  11082 0
 11078  11079 -11080 -150 -11083 0

c  2+1 --> break 
c    (-b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧  p_150) -> break
c  in CNF:
c     b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 11078 -11079  11080 -150 1162 0


c  2-1 --> 1
c    (-b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧ -p_150) -> (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0)
c  in CNF:
c     b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_2
c     b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_1
c     b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨  b^{10, 16}_0
c  in DIMACS:
 11078 -11079  11080  150 -11081 0
 11078 -11079  11080  150 -11082 0
 11078 -11079  11080  150  11083 0

c  1-1 --> 0
c    (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0 ∧ -p_150) -> (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧ -b^{10, 16}_0)
c  in CNF:
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_2
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_1
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_0
c  in DIMACS:
 11078  11079 -11080  150 -11081 0
 11078  11079 -11080  150 -11082 0
 11078  11079 -11080  150 -11083 0

c  0-1 --> -1
c    (-b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧ -p_150) -> ( b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0)
c  in CNF:
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨  b^{10, 16}_2
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_1
c     b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨  b^{10, 16}_0
c  in DIMACS:
 11078  11079  11080  150  11081 0
 11078  11079  11080  150 -11082 0
 11078  11079  11080  150  11083 0

c  -1-1 --> -2
c    ( b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧  b^{10, 15}_0 ∧ -p_150) -> ( b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0)
c  in CNF:
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨  b^{10, 16}_2
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨  b^{10, 16}_1
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨  p_150 ∨ -b^{10, 16}_0
c  in DIMACS:
-11078  11079 -11080  150  11081 0
-11078  11079 -11080  150  11082 0
-11078  11079 -11080  150 -11083 0

c  -2-1 --> break 
c    ( b^{10, 15}_2 ∧  b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨  b^{10, 15}_0 ∨  p_150 ∨ break
c  in DIMACS:
-11078 -11079  11080  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 15}_2 ∧ -b^{10, 15}_1 ∧ -b^{10, 15}_0 ∧ true) 
c  in CNF:
c    -b^{10, 15}_2 ∨  b^{10, 15}_1 ∨  b^{10, 15}_0 ∨ false 
c  in DIMACS:
-11078  11079  11080  0

c  3 does not represent an automaton state.
c    -(-b^{10, 15}_2 ∧  b^{10, 15}_1 ∧  b^{10, 15}_0 ∧ true) 
c  in CNF:
c     b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ false 
c  in DIMACS:
 11078 -11079 -11080  0
c  -3 does not represent an automaton state.
c    -( b^{10, 15}_2 ∧  b^{10, 15}_1 ∧  b^{10, 15}_0 ∧ true) 
c  in CNF:
c    -b^{10, 15}_2 ∨ -b^{10, 15}_1 ∨ -b^{10, 15}_0 ∨ false 
c  in DIMACS:
-11078 -11079 -11080  0

c i = 16
c  -2+1 --> -1
c    ( b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧  p_160) -> ( b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0)
c  in CNF:
c    -b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨  b^{10, 17}_2
c    -b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_1
c    -b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨  b^{10, 17}_0
c  in DIMACS:
-11081 -11082  11083 -160  11084 0
-11081 -11082  11083 -160 -11085 0
-11081 -11082  11083 -160  11086 0

c  -1+1 --> 0
c    ( b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0 ∧  p_160) -> (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧ -b^{10, 17}_0)
c  in CNF:
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_2
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_1
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_0
c  in DIMACS:
-11081  11082 -11083 -160 -11084 0
-11081  11082 -11083 -160 -11085 0
-11081  11082 -11083 -160 -11086 0

c  0+1 --> 1
c    (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧  p_160) -> (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0)
c  in CNF:
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_2
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_1
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨  b^{10, 17}_0
c  in DIMACS:
 11081  11082  11083 -160 -11084 0
 11081  11082  11083 -160 -11085 0
 11081  11082  11083 -160  11086 0

c  1+1 --> 2
c    (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0 ∧  p_160) -> (-b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0)
c  in CNF:
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_2
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨  b^{10, 17}_1
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ -p_160 ∨ -b^{10, 17}_0
c  in DIMACS:
 11081  11082 -11083 -160 -11084 0
 11081  11082 -11083 -160  11085 0
 11081  11082 -11083 -160 -11086 0

c  2+1 --> break 
c    (-b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧  p_160) -> break
c  in CNF:
c     b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 11081 -11082  11083 -160 1162 0


c  2-1 --> 1
c    (-b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧ -p_160) -> (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0)
c  in CNF:
c     b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_2
c     b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_1
c     b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨  b^{10, 17}_0
c  in DIMACS:
 11081 -11082  11083  160 -11084 0
 11081 -11082  11083  160 -11085 0
 11081 -11082  11083  160  11086 0

c  1-1 --> 0
c    (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0 ∧ -p_160) -> (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧ -b^{10, 17}_0)
c  in CNF:
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_2
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_1
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_0
c  in DIMACS:
 11081  11082 -11083  160 -11084 0
 11081  11082 -11083  160 -11085 0
 11081  11082 -11083  160 -11086 0

c  0-1 --> -1
c    (-b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧ -p_160) -> ( b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0)
c  in CNF:
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨  b^{10, 17}_2
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_1
c     b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨  b^{10, 17}_0
c  in DIMACS:
 11081  11082  11083  160  11084 0
 11081  11082  11083  160 -11085 0
 11081  11082  11083  160  11086 0

c  -1-1 --> -2
c    ( b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧  b^{10, 16}_0 ∧ -p_160) -> ( b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0)
c  in CNF:
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨  b^{10, 17}_2
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨  b^{10, 17}_1
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨  p_160 ∨ -b^{10, 17}_0
c  in DIMACS:
-11081  11082 -11083  160  11084 0
-11081  11082 -11083  160  11085 0
-11081  11082 -11083  160 -11086 0

c  -2-1 --> break 
c    ( b^{10, 16}_2 ∧  b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨  b^{10, 16}_0 ∨  p_160 ∨ break
c  in DIMACS:
-11081 -11082  11083  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 16}_2 ∧ -b^{10, 16}_1 ∧ -b^{10, 16}_0 ∧ true) 
c  in CNF:
c    -b^{10, 16}_2 ∨  b^{10, 16}_1 ∨  b^{10, 16}_0 ∨ false 
c  in DIMACS:
-11081  11082  11083  0

c  3 does not represent an automaton state.
c    -(-b^{10, 16}_2 ∧  b^{10, 16}_1 ∧  b^{10, 16}_0 ∧ true) 
c  in CNF:
c     b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ false 
c  in DIMACS:
 11081 -11082 -11083  0
c  -3 does not represent an automaton state.
c    -( b^{10, 16}_2 ∧  b^{10, 16}_1 ∧  b^{10, 16}_0 ∧ true) 
c  in CNF:
c    -b^{10, 16}_2 ∨ -b^{10, 16}_1 ∨ -b^{10, 16}_0 ∨ false 
c  in DIMACS:
-11081 -11082 -11083  0

c i = 17
c  -2+1 --> -1
c    ( b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧  p_170) -> ( b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0)
c  in CNF:
c    -b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨  b^{10, 18}_2
c    -b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_1
c    -b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨  b^{10, 18}_0
c  in DIMACS:
-11084 -11085  11086 -170  11087 0
-11084 -11085  11086 -170 -11088 0
-11084 -11085  11086 -170  11089 0

c  -1+1 --> 0
c    ( b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0 ∧  p_170) -> (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧ -b^{10, 18}_0)
c  in CNF:
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_2
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_1
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_0
c  in DIMACS:
-11084  11085 -11086 -170 -11087 0
-11084  11085 -11086 -170 -11088 0
-11084  11085 -11086 -170 -11089 0

c  0+1 --> 1
c    (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧  p_170) -> (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0)
c  in CNF:
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_2
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_1
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨  b^{10, 18}_0
c  in DIMACS:
 11084  11085  11086 -170 -11087 0
 11084  11085  11086 -170 -11088 0
 11084  11085  11086 -170  11089 0

c  1+1 --> 2
c    (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0 ∧  p_170) -> (-b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0)
c  in CNF:
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_2
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨  b^{10, 18}_1
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ -p_170 ∨ -b^{10, 18}_0
c  in DIMACS:
 11084  11085 -11086 -170 -11087 0
 11084  11085 -11086 -170  11088 0
 11084  11085 -11086 -170 -11089 0

c  2+1 --> break 
c    (-b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧  p_170) -> break
c  in CNF:
c     b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 11084 -11085  11086 -170 1162 0


c  2-1 --> 1
c    (-b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧ -p_170) -> (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0)
c  in CNF:
c     b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_2
c     b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_1
c     b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨  b^{10, 18}_0
c  in DIMACS:
 11084 -11085  11086  170 -11087 0
 11084 -11085  11086  170 -11088 0
 11084 -11085  11086  170  11089 0

c  1-1 --> 0
c    (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0 ∧ -p_170) -> (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧ -b^{10, 18}_0)
c  in CNF:
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_2
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_1
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_0
c  in DIMACS:
 11084  11085 -11086  170 -11087 0
 11084  11085 -11086  170 -11088 0
 11084  11085 -11086  170 -11089 0

c  0-1 --> -1
c    (-b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧ -p_170) -> ( b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0)
c  in CNF:
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨  b^{10, 18}_2
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_1
c     b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨  b^{10, 18}_0
c  in DIMACS:
 11084  11085  11086  170  11087 0
 11084  11085  11086  170 -11088 0
 11084  11085  11086  170  11089 0

c  -1-1 --> -2
c    ( b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧  b^{10, 17}_0 ∧ -p_170) -> ( b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0)
c  in CNF:
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨  b^{10, 18}_2
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨  b^{10, 18}_1
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨  p_170 ∨ -b^{10, 18}_0
c  in DIMACS:
-11084  11085 -11086  170  11087 0
-11084  11085 -11086  170  11088 0
-11084  11085 -11086  170 -11089 0

c  -2-1 --> break 
c    ( b^{10, 17}_2 ∧  b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨  b^{10, 17}_0 ∨  p_170 ∨ break
c  in DIMACS:
-11084 -11085  11086  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 17}_2 ∧ -b^{10, 17}_1 ∧ -b^{10, 17}_0 ∧ true) 
c  in CNF:
c    -b^{10, 17}_2 ∨  b^{10, 17}_1 ∨  b^{10, 17}_0 ∨ false 
c  in DIMACS:
-11084  11085  11086  0

c  3 does not represent an automaton state.
c    -(-b^{10, 17}_2 ∧  b^{10, 17}_1 ∧  b^{10, 17}_0 ∧ true) 
c  in CNF:
c     b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ false 
c  in DIMACS:
 11084 -11085 -11086  0
c  -3 does not represent an automaton state.
c    -( b^{10, 17}_2 ∧  b^{10, 17}_1 ∧  b^{10, 17}_0 ∧ true) 
c  in CNF:
c    -b^{10, 17}_2 ∨ -b^{10, 17}_1 ∨ -b^{10, 17}_0 ∨ false 
c  in DIMACS:
-11084 -11085 -11086  0

c i = 18
c  -2+1 --> -1
c    ( b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧  p_180) -> ( b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0)
c  in CNF:
c    -b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨  b^{10, 19}_2
c    -b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_1
c    -b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨  b^{10, 19}_0
c  in DIMACS:
-11087 -11088  11089 -180  11090 0
-11087 -11088  11089 -180 -11091 0
-11087 -11088  11089 -180  11092 0

c  -1+1 --> 0
c    ( b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0 ∧  p_180) -> (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧ -b^{10, 19}_0)
c  in CNF:
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_2
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_1
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_0
c  in DIMACS:
-11087  11088 -11089 -180 -11090 0
-11087  11088 -11089 -180 -11091 0
-11087  11088 -11089 -180 -11092 0

c  0+1 --> 1
c    (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧  p_180) -> (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0)
c  in CNF:
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_2
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_1
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨  b^{10, 19}_0
c  in DIMACS:
 11087  11088  11089 -180 -11090 0
 11087  11088  11089 -180 -11091 0
 11087  11088  11089 -180  11092 0

c  1+1 --> 2
c    (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0 ∧  p_180) -> (-b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0)
c  in CNF:
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_2
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨  b^{10, 19}_1
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ -p_180 ∨ -b^{10, 19}_0
c  in DIMACS:
 11087  11088 -11089 -180 -11090 0
 11087  11088 -11089 -180  11091 0
 11087  11088 -11089 -180 -11092 0

c  2+1 --> break 
c    (-b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧  p_180) -> break
c  in CNF:
c     b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 11087 -11088  11089 -180 1162 0


c  2-1 --> 1
c    (-b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧ -p_180) -> (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0)
c  in CNF:
c     b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_2
c     b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_1
c     b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨  b^{10, 19}_0
c  in DIMACS:
 11087 -11088  11089  180 -11090 0
 11087 -11088  11089  180 -11091 0
 11087 -11088  11089  180  11092 0

c  1-1 --> 0
c    (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0 ∧ -p_180) -> (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧ -b^{10, 19}_0)
c  in CNF:
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_2
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_1
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_0
c  in DIMACS:
 11087  11088 -11089  180 -11090 0
 11087  11088 -11089  180 -11091 0
 11087  11088 -11089  180 -11092 0

c  0-1 --> -1
c    (-b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧ -p_180) -> ( b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0)
c  in CNF:
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨  b^{10, 19}_2
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_1
c     b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨  b^{10, 19}_0
c  in DIMACS:
 11087  11088  11089  180  11090 0
 11087  11088  11089  180 -11091 0
 11087  11088  11089  180  11092 0

c  -1-1 --> -2
c    ( b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧  b^{10, 18}_0 ∧ -p_180) -> ( b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0)
c  in CNF:
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨  b^{10, 19}_2
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨  b^{10, 19}_1
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨  p_180 ∨ -b^{10, 19}_0
c  in DIMACS:
-11087  11088 -11089  180  11090 0
-11087  11088 -11089  180  11091 0
-11087  11088 -11089  180 -11092 0

c  -2-1 --> break 
c    ( b^{10, 18}_2 ∧  b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨  b^{10, 18}_0 ∨  p_180 ∨ break
c  in DIMACS:
-11087 -11088  11089  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 18}_2 ∧ -b^{10, 18}_1 ∧ -b^{10, 18}_0 ∧ true) 
c  in CNF:
c    -b^{10, 18}_2 ∨  b^{10, 18}_1 ∨  b^{10, 18}_0 ∨ false 
c  in DIMACS:
-11087  11088  11089  0

c  3 does not represent an automaton state.
c    -(-b^{10, 18}_2 ∧  b^{10, 18}_1 ∧  b^{10, 18}_0 ∧ true) 
c  in CNF:
c     b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ false 
c  in DIMACS:
 11087 -11088 -11089  0
c  -3 does not represent an automaton state.
c    -( b^{10, 18}_2 ∧  b^{10, 18}_1 ∧  b^{10, 18}_0 ∧ true) 
c  in CNF:
c    -b^{10, 18}_2 ∨ -b^{10, 18}_1 ∨ -b^{10, 18}_0 ∨ false 
c  in DIMACS:
-11087 -11088 -11089  0

c i = 19
c  -2+1 --> -1
c    ( b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧  p_190) -> ( b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0)
c  in CNF:
c    -b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨  b^{10, 20}_2
c    -b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_1
c    -b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨  b^{10, 20}_0
c  in DIMACS:
-11090 -11091  11092 -190  11093 0
-11090 -11091  11092 -190 -11094 0
-11090 -11091  11092 -190  11095 0

c  -1+1 --> 0
c    ( b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0 ∧  p_190) -> (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧ -b^{10, 20}_0)
c  in CNF:
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_2
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_1
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_0
c  in DIMACS:
-11090  11091 -11092 -190 -11093 0
-11090  11091 -11092 -190 -11094 0
-11090  11091 -11092 -190 -11095 0

c  0+1 --> 1
c    (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧  p_190) -> (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0)
c  in CNF:
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_2
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_1
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨  b^{10, 20}_0
c  in DIMACS:
 11090  11091  11092 -190 -11093 0
 11090  11091  11092 -190 -11094 0
 11090  11091  11092 -190  11095 0

c  1+1 --> 2
c    (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0 ∧  p_190) -> (-b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0)
c  in CNF:
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_2
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨  b^{10, 20}_1
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ -p_190 ∨ -b^{10, 20}_0
c  in DIMACS:
 11090  11091 -11092 -190 -11093 0
 11090  11091 -11092 -190  11094 0
 11090  11091 -11092 -190 -11095 0

c  2+1 --> break 
c    (-b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧  p_190) -> break
c  in CNF:
c     b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 11090 -11091  11092 -190 1162 0


c  2-1 --> 1
c    (-b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧ -p_190) -> (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0)
c  in CNF:
c     b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_2
c     b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_1
c     b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨  b^{10, 20}_0
c  in DIMACS:
 11090 -11091  11092  190 -11093 0
 11090 -11091  11092  190 -11094 0
 11090 -11091  11092  190  11095 0

c  1-1 --> 0
c    (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0 ∧ -p_190) -> (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧ -b^{10, 20}_0)
c  in CNF:
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_2
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_1
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_0
c  in DIMACS:
 11090  11091 -11092  190 -11093 0
 11090  11091 -11092  190 -11094 0
 11090  11091 -11092  190 -11095 0

c  0-1 --> -1
c    (-b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧ -p_190) -> ( b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0)
c  in CNF:
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨  b^{10, 20}_2
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_1
c     b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨  b^{10, 20}_0
c  in DIMACS:
 11090  11091  11092  190  11093 0
 11090  11091  11092  190 -11094 0
 11090  11091  11092  190  11095 0

c  -1-1 --> -2
c    ( b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧  b^{10, 19}_0 ∧ -p_190) -> ( b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0)
c  in CNF:
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨  b^{10, 20}_2
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨  b^{10, 20}_1
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨  p_190 ∨ -b^{10, 20}_0
c  in DIMACS:
-11090  11091 -11092  190  11093 0
-11090  11091 -11092  190  11094 0
-11090  11091 -11092  190 -11095 0

c  -2-1 --> break 
c    ( b^{10, 19}_2 ∧  b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨  b^{10, 19}_0 ∨  p_190 ∨ break
c  in DIMACS:
-11090 -11091  11092  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 19}_2 ∧ -b^{10, 19}_1 ∧ -b^{10, 19}_0 ∧ true) 
c  in CNF:
c    -b^{10, 19}_2 ∨  b^{10, 19}_1 ∨  b^{10, 19}_0 ∨ false 
c  in DIMACS:
-11090  11091  11092  0

c  3 does not represent an automaton state.
c    -(-b^{10, 19}_2 ∧  b^{10, 19}_1 ∧  b^{10, 19}_0 ∧ true) 
c  in CNF:
c     b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ false 
c  in DIMACS:
 11090 -11091 -11092  0
c  -3 does not represent an automaton state.
c    -( b^{10, 19}_2 ∧  b^{10, 19}_1 ∧  b^{10, 19}_0 ∧ true) 
c  in CNF:
c    -b^{10, 19}_2 ∨ -b^{10, 19}_1 ∨ -b^{10, 19}_0 ∨ false 
c  in DIMACS:
-11090 -11091 -11092  0

c i = 20
c  -2+1 --> -1
c    ( b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧  p_200) -> ( b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0)
c  in CNF:
c    -b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨  b^{10, 21}_2
c    -b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_1
c    -b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨  b^{10, 21}_0
c  in DIMACS:
-11093 -11094  11095 -200  11096 0
-11093 -11094  11095 -200 -11097 0
-11093 -11094  11095 -200  11098 0

c  -1+1 --> 0
c    ( b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0 ∧  p_200) -> (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧ -b^{10, 21}_0)
c  in CNF:
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_2
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_1
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_0
c  in DIMACS:
-11093  11094 -11095 -200 -11096 0
-11093  11094 -11095 -200 -11097 0
-11093  11094 -11095 -200 -11098 0

c  0+1 --> 1
c    (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧  p_200) -> (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0)
c  in CNF:
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_2
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_1
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨  b^{10, 21}_0
c  in DIMACS:
 11093  11094  11095 -200 -11096 0
 11093  11094  11095 -200 -11097 0
 11093  11094  11095 -200  11098 0

c  1+1 --> 2
c    (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0 ∧  p_200) -> (-b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0)
c  in CNF:
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_2
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨  b^{10, 21}_1
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ -p_200 ∨ -b^{10, 21}_0
c  in DIMACS:
 11093  11094 -11095 -200 -11096 0
 11093  11094 -11095 -200  11097 0
 11093  11094 -11095 -200 -11098 0

c  2+1 --> break 
c    (-b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧  p_200) -> break
c  in CNF:
c     b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 11093 -11094  11095 -200 1162 0


c  2-1 --> 1
c    (-b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧ -p_200) -> (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0)
c  in CNF:
c     b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_2
c     b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_1
c     b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨  b^{10, 21}_0
c  in DIMACS:
 11093 -11094  11095  200 -11096 0
 11093 -11094  11095  200 -11097 0
 11093 -11094  11095  200  11098 0

c  1-1 --> 0
c    (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0 ∧ -p_200) -> (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧ -b^{10, 21}_0)
c  in CNF:
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_2
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_1
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_0
c  in DIMACS:
 11093  11094 -11095  200 -11096 0
 11093  11094 -11095  200 -11097 0
 11093  11094 -11095  200 -11098 0

c  0-1 --> -1
c    (-b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧ -p_200) -> ( b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0)
c  in CNF:
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨  b^{10, 21}_2
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_1
c     b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨  b^{10, 21}_0
c  in DIMACS:
 11093  11094  11095  200  11096 0
 11093  11094  11095  200 -11097 0
 11093  11094  11095  200  11098 0

c  -1-1 --> -2
c    ( b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧  b^{10, 20}_0 ∧ -p_200) -> ( b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0)
c  in CNF:
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨  b^{10, 21}_2
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨  b^{10, 21}_1
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨  p_200 ∨ -b^{10, 21}_0
c  in DIMACS:
-11093  11094 -11095  200  11096 0
-11093  11094 -11095  200  11097 0
-11093  11094 -11095  200 -11098 0

c  -2-1 --> break 
c    ( b^{10, 20}_2 ∧  b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨  b^{10, 20}_0 ∨  p_200 ∨ break
c  in DIMACS:
-11093 -11094  11095  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 20}_2 ∧ -b^{10, 20}_1 ∧ -b^{10, 20}_0 ∧ true) 
c  in CNF:
c    -b^{10, 20}_2 ∨  b^{10, 20}_1 ∨  b^{10, 20}_0 ∨ false 
c  in DIMACS:
-11093  11094  11095  0

c  3 does not represent an automaton state.
c    -(-b^{10, 20}_2 ∧  b^{10, 20}_1 ∧  b^{10, 20}_0 ∧ true) 
c  in CNF:
c     b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ false 
c  in DIMACS:
 11093 -11094 -11095  0
c  -3 does not represent an automaton state.
c    -( b^{10, 20}_2 ∧  b^{10, 20}_1 ∧  b^{10, 20}_0 ∧ true) 
c  in CNF:
c    -b^{10, 20}_2 ∨ -b^{10, 20}_1 ∨ -b^{10, 20}_0 ∨ false 
c  in DIMACS:
-11093 -11094 -11095  0

c i = 21
c  -2+1 --> -1
c    ( b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧  p_210) -> ( b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0)
c  in CNF:
c    -b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨  b^{10, 22}_2
c    -b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_1
c    -b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨  b^{10, 22}_0
c  in DIMACS:
-11096 -11097  11098 -210  11099 0
-11096 -11097  11098 -210 -11100 0
-11096 -11097  11098 -210  11101 0

c  -1+1 --> 0
c    ( b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0 ∧  p_210) -> (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧ -b^{10, 22}_0)
c  in CNF:
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_2
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_1
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_0
c  in DIMACS:
-11096  11097 -11098 -210 -11099 0
-11096  11097 -11098 -210 -11100 0
-11096  11097 -11098 -210 -11101 0

c  0+1 --> 1
c    (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧  p_210) -> (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0)
c  in CNF:
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_2
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_1
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨  b^{10, 22}_0
c  in DIMACS:
 11096  11097  11098 -210 -11099 0
 11096  11097  11098 -210 -11100 0
 11096  11097  11098 -210  11101 0

c  1+1 --> 2
c    (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0 ∧  p_210) -> (-b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0)
c  in CNF:
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_2
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨  b^{10, 22}_1
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ -p_210 ∨ -b^{10, 22}_0
c  in DIMACS:
 11096  11097 -11098 -210 -11099 0
 11096  11097 -11098 -210  11100 0
 11096  11097 -11098 -210 -11101 0

c  2+1 --> break 
c    (-b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧  p_210) -> break
c  in CNF:
c     b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 11096 -11097  11098 -210 1162 0


c  2-1 --> 1
c    (-b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧ -p_210) -> (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0)
c  in CNF:
c     b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_2
c     b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_1
c     b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨  b^{10, 22}_0
c  in DIMACS:
 11096 -11097  11098  210 -11099 0
 11096 -11097  11098  210 -11100 0
 11096 -11097  11098  210  11101 0

c  1-1 --> 0
c    (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0 ∧ -p_210) -> (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧ -b^{10, 22}_0)
c  in CNF:
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_2
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_1
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_0
c  in DIMACS:
 11096  11097 -11098  210 -11099 0
 11096  11097 -11098  210 -11100 0
 11096  11097 -11098  210 -11101 0

c  0-1 --> -1
c    (-b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧ -p_210) -> ( b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0)
c  in CNF:
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨  b^{10, 22}_2
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_1
c     b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨  b^{10, 22}_0
c  in DIMACS:
 11096  11097  11098  210  11099 0
 11096  11097  11098  210 -11100 0
 11096  11097  11098  210  11101 0

c  -1-1 --> -2
c    ( b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧  b^{10, 21}_0 ∧ -p_210) -> ( b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0)
c  in CNF:
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨  b^{10, 22}_2
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨  b^{10, 22}_1
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨  p_210 ∨ -b^{10, 22}_0
c  in DIMACS:
-11096  11097 -11098  210  11099 0
-11096  11097 -11098  210  11100 0
-11096  11097 -11098  210 -11101 0

c  -2-1 --> break 
c    ( b^{10, 21}_2 ∧  b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨  b^{10, 21}_0 ∨  p_210 ∨ break
c  in DIMACS:
-11096 -11097  11098  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 21}_2 ∧ -b^{10, 21}_1 ∧ -b^{10, 21}_0 ∧ true) 
c  in CNF:
c    -b^{10, 21}_2 ∨  b^{10, 21}_1 ∨  b^{10, 21}_0 ∨ false 
c  in DIMACS:
-11096  11097  11098  0

c  3 does not represent an automaton state.
c    -(-b^{10, 21}_2 ∧  b^{10, 21}_1 ∧  b^{10, 21}_0 ∧ true) 
c  in CNF:
c     b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ false 
c  in DIMACS:
 11096 -11097 -11098  0
c  -3 does not represent an automaton state.
c    -( b^{10, 21}_2 ∧  b^{10, 21}_1 ∧  b^{10, 21}_0 ∧ true) 
c  in CNF:
c    -b^{10, 21}_2 ∨ -b^{10, 21}_1 ∨ -b^{10, 21}_0 ∨ false 
c  in DIMACS:
-11096 -11097 -11098  0

c i = 22
c  -2+1 --> -1
c    ( b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧  p_220) -> ( b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0)
c  in CNF:
c    -b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨  b^{10, 23}_2
c    -b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_1
c    -b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨  b^{10, 23}_0
c  in DIMACS:
-11099 -11100  11101 -220  11102 0
-11099 -11100  11101 -220 -11103 0
-11099 -11100  11101 -220  11104 0

c  -1+1 --> 0
c    ( b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0 ∧  p_220) -> (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧ -b^{10, 23}_0)
c  in CNF:
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_2
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_1
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_0
c  in DIMACS:
-11099  11100 -11101 -220 -11102 0
-11099  11100 -11101 -220 -11103 0
-11099  11100 -11101 -220 -11104 0

c  0+1 --> 1
c    (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧  p_220) -> (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0)
c  in CNF:
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_2
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_1
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨  b^{10, 23}_0
c  in DIMACS:
 11099  11100  11101 -220 -11102 0
 11099  11100  11101 -220 -11103 0
 11099  11100  11101 -220  11104 0

c  1+1 --> 2
c    (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0 ∧  p_220) -> (-b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0)
c  in CNF:
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_2
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨  b^{10, 23}_1
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ -p_220 ∨ -b^{10, 23}_0
c  in DIMACS:
 11099  11100 -11101 -220 -11102 0
 11099  11100 -11101 -220  11103 0
 11099  11100 -11101 -220 -11104 0

c  2+1 --> break 
c    (-b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧  p_220) -> break
c  in CNF:
c     b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 11099 -11100  11101 -220 1162 0


c  2-1 --> 1
c    (-b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧ -p_220) -> (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0)
c  in CNF:
c     b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_2
c     b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_1
c     b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨  b^{10, 23}_0
c  in DIMACS:
 11099 -11100  11101  220 -11102 0
 11099 -11100  11101  220 -11103 0
 11099 -11100  11101  220  11104 0

c  1-1 --> 0
c    (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0 ∧ -p_220) -> (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧ -b^{10, 23}_0)
c  in CNF:
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_2
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_1
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_0
c  in DIMACS:
 11099  11100 -11101  220 -11102 0
 11099  11100 -11101  220 -11103 0
 11099  11100 -11101  220 -11104 0

c  0-1 --> -1
c    (-b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧ -p_220) -> ( b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0)
c  in CNF:
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨  b^{10, 23}_2
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_1
c     b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨  b^{10, 23}_0
c  in DIMACS:
 11099  11100  11101  220  11102 0
 11099  11100  11101  220 -11103 0
 11099  11100  11101  220  11104 0

c  -1-1 --> -2
c    ( b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧  b^{10, 22}_0 ∧ -p_220) -> ( b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0)
c  in CNF:
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨  b^{10, 23}_2
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨  b^{10, 23}_1
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨  p_220 ∨ -b^{10, 23}_0
c  in DIMACS:
-11099  11100 -11101  220  11102 0
-11099  11100 -11101  220  11103 0
-11099  11100 -11101  220 -11104 0

c  -2-1 --> break 
c    ( b^{10, 22}_2 ∧  b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨  b^{10, 22}_0 ∨  p_220 ∨ break
c  in DIMACS:
-11099 -11100  11101  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 22}_2 ∧ -b^{10, 22}_1 ∧ -b^{10, 22}_0 ∧ true) 
c  in CNF:
c    -b^{10, 22}_2 ∨  b^{10, 22}_1 ∨  b^{10, 22}_0 ∨ false 
c  in DIMACS:
-11099  11100  11101  0

c  3 does not represent an automaton state.
c    -(-b^{10, 22}_2 ∧  b^{10, 22}_1 ∧  b^{10, 22}_0 ∧ true) 
c  in CNF:
c     b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ false 
c  in DIMACS:
 11099 -11100 -11101  0
c  -3 does not represent an automaton state.
c    -( b^{10, 22}_2 ∧  b^{10, 22}_1 ∧  b^{10, 22}_0 ∧ true) 
c  in CNF:
c    -b^{10, 22}_2 ∨ -b^{10, 22}_1 ∨ -b^{10, 22}_0 ∨ false 
c  in DIMACS:
-11099 -11100 -11101  0

c i = 23
c  -2+1 --> -1
c    ( b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧  p_230) -> ( b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0)
c  in CNF:
c    -b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨  b^{10, 24}_2
c    -b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_1
c    -b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨  b^{10, 24}_0
c  in DIMACS:
-11102 -11103  11104 -230  11105 0
-11102 -11103  11104 -230 -11106 0
-11102 -11103  11104 -230  11107 0

c  -1+1 --> 0
c    ( b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0 ∧  p_230) -> (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧ -b^{10, 24}_0)
c  in CNF:
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_2
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_1
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_0
c  in DIMACS:
-11102  11103 -11104 -230 -11105 0
-11102  11103 -11104 -230 -11106 0
-11102  11103 -11104 -230 -11107 0

c  0+1 --> 1
c    (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧  p_230) -> (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0)
c  in CNF:
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_2
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_1
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨  b^{10, 24}_0
c  in DIMACS:
 11102  11103  11104 -230 -11105 0
 11102  11103  11104 -230 -11106 0
 11102  11103  11104 -230  11107 0

c  1+1 --> 2
c    (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0 ∧  p_230) -> (-b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0)
c  in CNF:
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_2
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨  b^{10, 24}_1
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ -p_230 ∨ -b^{10, 24}_0
c  in DIMACS:
 11102  11103 -11104 -230 -11105 0
 11102  11103 -11104 -230  11106 0
 11102  11103 -11104 -230 -11107 0

c  2+1 --> break 
c    (-b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧  p_230) -> break
c  in CNF:
c     b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 11102 -11103  11104 -230 1162 0


c  2-1 --> 1
c    (-b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧ -p_230) -> (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0)
c  in CNF:
c     b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_2
c     b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_1
c     b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨  b^{10, 24}_0
c  in DIMACS:
 11102 -11103  11104  230 -11105 0
 11102 -11103  11104  230 -11106 0
 11102 -11103  11104  230  11107 0

c  1-1 --> 0
c    (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0 ∧ -p_230) -> (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧ -b^{10, 24}_0)
c  in CNF:
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_2
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_1
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_0
c  in DIMACS:
 11102  11103 -11104  230 -11105 0
 11102  11103 -11104  230 -11106 0
 11102  11103 -11104  230 -11107 0

c  0-1 --> -1
c    (-b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧ -p_230) -> ( b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0)
c  in CNF:
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨  b^{10, 24}_2
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_1
c     b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨  b^{10, 24}_0
c  in DIMACS:
 11102  11103  11104  230  11105 0
 11102  11103  11104  230 -11106 0
 11102  11103  11104  230  11107 0

c  -1-1 --> -2
c    ( b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧  b^{10, 23}_0 ∧ -p_230) -> ( b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0)
c  in CNF:
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨  b^{10, 24}_2
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨  b^{10, 24}_1
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨  p_230 ∨ -b^{10, 24}_0
c  in DIMACS:
-11102  11103 -11104  230  11105 0
-11102  11103 -11104  230  11106 0
-11102  11103 -11104  230 -11107 0

c  -2-1 --> break 
c    ( b^{10, 23}_2 ∧  b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨  b^{10, 23}_0 ∨  p_230 ∨ break
c  in DIMACS:
-11102 -11103  11104  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 23}_2 ∧ -b^{10, 23}_1 ∧ -b^{10, 23}_0 ∧ true) 
c  in CNF:
c    -b^{10, 23}_2 ∨  b^{10, 23}_1 ∨  b^{10, 23}_0 ∨ false 
c  in DIMACS:
-11102  11103  11104  0

c  3 does not represent an automaton state.
c    -(-b^{10, 23}_2 ∧  b^{10, 23}_1 ∧  b^{10, 23}_0 ∧ true) 
c  in CNF:
c     b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ false 
c  in DIMACS:
 11102 -11103 -11104  0
c  -3 does not represent an automaton state.
c    -( b^{10, 23}_2 ∧  b^{10, 23}_1 ∧  b^{10, 23}_0 ∧ true) 
c  in CNF:
c    -b^{10, 23}_2 ∨ -b^{10, 23}_1 ∨ -b^{10, 23}_0 ∨ false 
c  in DIMACS:
-11102 -11103 -11104  0

c i = 24
c  -2+1 --> -1
c    ( b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧  p_240) -> ( b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0)
c  in CNF:
c    -b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨  b^{10, 25}_2
c    -b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_1
c    -b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨  b^{10, 25}_0
c  in DIMACS:
-11105 -11106  11107 -240  11108 0
-11105 -11106  11107 -240 -11109 0
-11105 -11106  11107 -240  11110 0

c  -1+1 --> 0
c    ( b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0 ∧  p_240) -> (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧ -b^{10, 25}_0)
c  in CNF:
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_2
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_1
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_0
c  in DIMACS:
-11105  11106 -11107 -240 -11108 0
-11105  11106 -11107 -240 -11109 0
-11105  11106 -11107 -240 -11110 0

c  0+1 --> 1
c    (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧  p_240) -> (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0)
c  in CNF:
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_2
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_1
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨  b^{10, 25}_0
c  in DIMACS:
 11105  11106  11107 -240 -11108 0
 11105  11106  11107 -240 -11109 0
 11105  11106  11107 -240  11110 0

c  1+1 --> 2
c    (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0 ∧  p_240) -> (-b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0)
c  in CNF:
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_2
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨  b^{10, 25}_1
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ -p_240 ∨ -b^{10, 25}_0
c  in DIMACS:
 11105  11106 -11107 -240 -11108 0
 11105  11106 -11107 -240  11109 0
 11105  11106 -11107 -240 -11110 0

c  2+1 --> break 
c    (-b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧  p_240) -> break
c  in CNF:
c     b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 11105 -11106  11107 -240 1162 0


c  2-1 --> 1
c    (-b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧ -p_240) -> (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0)
c  in CNF:
c     b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_2
c     b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_1
c     b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨  b^{10, 25}_0
c  in DIMACS:
 11105 -11106  11107  240 -11108 0
 11105 -11106  11107  240 -11109 0
 11105 -11106  11107  240  11110 0

c  1-1 --> 0
c    (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0 ∧ -p_240) -> (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧ -b^{10, 25}_0)
c  in CNF:
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_2
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_1
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_0
c  in DIMACS:
 11105  11106 -11107  240 -11108 0
 11105  11106 -11107  240 -11109 0
 11105  11106 -11107  240 -11110 0

c  0-1 --> -1
c    (-b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧ -p_240) -> ( b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0)
c  in CNF:
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨  b^{10, 25}_2
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_1
c     b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨  b^{10, 25}_0
c  in DIMACS:
 11105  11106  11107  240  11108 0
 11105  11106  11107  240 -11109 0
 11105  11106  11107  240  11110 0

c  -1-1 --> -2
c    ( b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧  b^{10, 24}_0 ∧ -p_240) -> ( b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0)
c  in CNF:
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨  b^{10, 25}_2
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨  b^{10, 25}_1
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨  p_240 ∨ -b^{10, 25}_0
c  in DIMACS:
-11105  11106 -11107  240  11108 0
-11105  11106 -11107  240  11109 0
-11105  11106 -11107  240 -11110 0

c  -2-1 --> break 
c    ( b^{10, 24}_2 ∧  b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨  b^{10, 24}_0 ∨  p_240 ∨ break
c  in DIMACS:
-11105 -11106  11107  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 24}_2 ∧ -b^{10, 24}_1 ∧ -b^{10, 24}_0 ∧ true) 
c  in CNF:
c    -b^{10, 24}_2 ∨  b^{10, 24}_1 ∨  b^{10, 24}_0 ∨ false 
c  in DIMACS:
-11105  11106  11107  0

c  3 does not represent an automaton state.
c    -(-b^{10, 24}_2 ∧  b^{10, 24}_1 ∧  b^{10, 24}_0 ∧ true) 
c  in CNF:
c     b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ false 
c  in DIMACS:
 11105 -11106 -11107  0
c  -3 does not represent an automaton state.
c    -( b^{10, 24}_2 ∧  b^{10, 24}_1 ∧  b^{10, 24}_0 ∧ true) 
c  in CNF:
c    -b^{10, 24}_2 ∨ -b^{10, 24}_1 ∨ -b^{10, 24}_0 ∨ false 
c  in DIMACS:
-11105 -11106 -11107  0

c i = 25
c  -2+1 --> -1
c    ( b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧  p_250) -> ( b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0)
c  in CNF:
c    -b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨  b^{10, 26}_2
c    -b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_1
c    -b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨  b^{10, 26}_0
c  in DIMACS:
-11108 -11109  11110 -250  11111 0
-11108 -11109  11110 -250 -11112 0
-11108 -11109  11110 -250  11113 0

c  -1+1 --> 0
c    ( b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0 ∧  p_250) -> (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧ -b^{10, 26}_0)
c  in CNF:
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_2
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_1
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_0
c  in DIMACS:
-11108  11109 -11110 -250 -11111 0
-11108  11109 -11110 -250 -11112 0
-11108  11109 -11110 -250 -11113 0

c  0+1 --> 1
c    (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧  p_250) -> (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0)
c  in CNF:
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_2
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_1
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨  b^{10, 26}_0
c  in DIMACS:
 11108  11109  11110 -250 -11111 0
 11108  11109  11110 -250 -11112 0
 11108  11109  11110 -250  11113 0

c  1+1 --> 2
c    (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0 ∧  p_250) -> (-b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0)
c  in CNF:
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_2
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨  b^{10, 26}_1
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ -p_250 ∨ -b^{10, 26}_0
c  in DIMACS:
 11108  11109 -11110 -250 -11111 0
 11108  11109 -11110 -250  11112 0
 11108  11109 -11110 -250 -11113 0

c  2+1 --> break 
c    (-b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧  p_250) -> break
c  in CNF:
c     b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 11108 -11109  11110 -250 1162 0


c  2-1 --> 1
c    (-b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧ -p_250) -> (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0)
c  in CNF:
c     b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_2
c     b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_1
c     b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨  b^{10, 26}_0
c  in DIMACS:
 11108 -11109  11110  250 -11111 0
 11108 -11109  11110  250 -11112 0
 11108 -11109  11110  250  11113 0

c  1-1 --> 0
c    (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0 ∧ -p_250) -> (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧ -b^{10, 26}_0)
c  in CNF:
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_2
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_1
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_0
c  in DIMACS:
 11108  11109 -11110  250 -11111 0
 11108  11109 -11110  250 -11112 0
 11108  11109 -11110  250 -11113 0

c  0-1 --> -1
c    (-b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧ -p_250) -> ( b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0)
c  in CNF:
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨  b^{10, 26}_2
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_1
c     b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨  b^{10, 26}_0
c  in DIMACS:
 11108  11109  11110  250  11111 0
 11108  11109  11110  250 -11112 0
 11108  11109  11110  250  11113 0

c  -1-1 --> -2
c    ( b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧  b^{10, 25}_0 ∧ -p_250) -> ( b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0)
c  in CNF:
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨  b^{10, 26}_2
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨  b^{10, 26}_1
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨  p_250 ∨ -b^{10, 26}_0
c  in DIMACS:
-11108  11109 -11110  250  11111 0
-11108  11109 -11110  250  11112 0
-11108  11109 -11110  250 -11113 0

c  -2-1 --> break 
c    ( b^{10, 25}_2 ∧  b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨  b^{10, 25}_0 ∨  p_250 ∨ break
c  in DIMACS:
-11108 -11109  11110  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 25}_2 ∧ -b^{10, 25}_1 ∧ -b^{10, 25}_0 ∧ true) 
c  in CNF:
c    -b^{10, 25}_2 ∨  b^{10, 25}_1 ∨  b^{10, 25}_0 ∨ false 
c  in DIMACS:
-11108  11109  11110  0

c  3 does not represent an automaton state.
c    -(-b^{10, 25}_2 ∧  b^{10, 25}_1 ∧  b^{10, 25}_0 ∧ true) 
c  in CNF:
c     b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ false 
c  in DIMACS:
 11108 -11109 -11110  0
c  -3 does not represent an automaton state.
c    -( b^{10, 25}_2 ∧  b^{10, 25}_1 ∧  b^{10, 25}_0 ∧ true) 
c  in CNF:
c    -b^{10, 25}_2 ∨ -b^{10, 25}_1 ∨ -b^{10, 25}_0 ∨ false 
c  in DIMACS:
-11108 -11109 -11110  0

c i = 26
c  -2+1 --> -1
c    ( b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧  p_260) -> ( b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0)
c  in CNF:
c    -b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨  b^{10, 27}_2
c    -b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_1
c    -b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨  b^{10, 27}_0
c  in DIMACS:
-11111 -11112  11113 -260  11114 0
-11111 -11112  11113 -260 -11115 0
-11111 -11112  11113 -260  11116 0

c  -1+1 --> 0
c    ( b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0 ∧  p_260) -> (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧ -b^{10, 27}_0)
c  in CNF:
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_2
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_1
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_0
c  in DIMACS:
-11111  11112 -11113 -260 -11114 0
-11111  11112 -11113 -260 -11115 0
-11111  11112 -11113 -260 -11116 0

c  0+1 --> 1
c    (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧  p_260) -> (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0)
c  in CNF:
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_2
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_1
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨  b^{10, 27}_0
c  in DIMACS:
 11111  11112  11113 -260 -11114 0
 11111  11112  11113 -260 -11115 0
 11111  11112  11113 -260  11116 0

c  1+1 --> 2
c    (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0 ∧  p_260) -> (-b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0)
c  in CNF:
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_2
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨  b^{10, 27}_1
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ -p_260 ∨ -b^{10, 27}_0
c  in DIMACS:
 11111  11112 -11113 -260 -11114 0
 11111  11112 -11113 -260  11115 0
 11111  11112 -11113 -260 -11116 0

c  2+1 --> break 
c    (-b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧  p_260) -> break
c  in CNF:
c     b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 11111 -11112  11113 -260 1162 0


c  2-1 --> 1
c    (-b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧ -p_260) -> (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0)
c  in CNF:
c     b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_2
c     b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_1
c     b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨  b^{10, 27}_0
c  in DIMACS:
 11111 -11112  11113  260 -11114 0
 11111 -11112  11113  260 -11115 0
 11111 -11112  11113  260  11116 0

c  1-1 --> 0
c    (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0 ∧ -p_260) -> (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧ -b^{10, 27}_0)
c  in CNF:
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_2
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_1
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_0
c  in DIMACS:
 11111  11112 -11113  260 -11114 0
 11111  11112 -11113  260 -11115 0
 11111  11112 -11113  260 -11116 0

c  0-1 --> -1
c    (-b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧ -p_260) -> ( b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0)
c  in CNF:
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨  b^{10, 27}_2
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_1
c     b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨  b^{10, 27}_0
c  in DIMACS:
 11111  11112  11113  260  11114 0
 11111  11112  11113  260 -11115 0
 11111  11112  11113  260  11116 0

c  -1-1 --> -2
c    ( b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧  b^{10, 26}_0 ∧ -p_260) -> ( b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0)
c  in CNF:
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨  b^{10, 27}_2
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨  b^{10, 27}_1
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨  p_260 ∨ -b^{10, 27}_0
c  in DIMACS:
-11111  11112 -11113  260  11114 0
-11111  11112 -11113  260  11115 0
-11111  11112 -11113  260 -11116 0

c  -2-1 --> break 
c    ( b^{10, 26}_2 ∧  b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨  b^{10, 26}_0 ∨  p_260 ∨ break
c  in DIMACS:
-11111 -11112  11113  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 26}_2 ∧ -b^{10, 26}_1 ∧ -b^{10, 26}_0 ∧ true) 
c  in CNF:
c    -b^{10, 26}_2 ∨  b^{10, 26}_1 ∨  b^{10, 26}_0 ∨ false 
c  in DIMACS:
-11111  11112  11113  0

c  3 does not represent an automaton state.
c    -(-b^{10, 26}_2 ∧  b^{10, 26}_1 ∧  b^{10, 26}_0 ∧ true) 
c  in CNF:
c     b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ false 
c  in DIMACS:
 11111 -11112 -11113  0
c  -3 does not represent an automaton state.
c    -( b^{10, 26}_2 ∧  b^{10, 26}_1 ∧  b^{10, 26}_0 ∧ true) 
c  in CNF:
c    -b^{10, 26}_2 ∨ -b^{10, 26}_1 ∨ -b^{10, 26}_0 ∨ false 
c  in DIMACS:
-11111 -11112 -11113  0

c i = 27
c  -2+1 --> -1
c    ( b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧  p_270) -> ( b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0)
c  in CNF:
c    -b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨  b^{10, 28}_2
c    -b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_1
c    -b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨  b^{10, 28}_0
c  in DIMACS:
-11114 -11115  11116 -270  11117 0
-11114 -11115  11116 -270 -11118 0
-11114 -11115  11116 -270  11119 0

c  -1+1 --> 0
c    ( b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0 ∧  p_270) -> (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧ -b^{10, 28}_0)
c  in CNF:
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_2
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_1
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_0
c  in DIMACS:
-11114  11115 -11116 -270 -11117 0
-11114  11115 -11116 -270 -11118 0
-11114  11115 -11116 -270 -11119 0

c  0+1 --> 1
c    (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧  p_270) -> (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0)
c  in CNF:
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_2
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_1
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨  b^{10, 28}_0
c  in DIMACS:
 11114  11115  11116 -270 -11117 0
 11114  11115  11116 -270 -11118 0
 11114  11115  11116 -270  11119 0

c  1+1 --> 2
c    (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0 ∧  p_270) -> (-b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0)
c  in CNF:
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_2
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨  b^{10, 28}_1
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ -p_270 ∨ -b^{10, 28}_0
c  in DIMACS:
 11114  11115 -11116 -270 -11117 0
 11114  11115 -11116 -270  11118 0
 11114  11115 -11116 -270 -11119 0

c  2+1 --> break 
c    (-b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧  p_270) -> break
c  in CNF:
c     b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 11114 -11115  11116 -270 1162 0


c  2-1 --> 1
c    (-b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧ -p_270) -> (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0)
c  in CNF:
c     b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_2
c     b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_1
c     b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨  b^{10, 28}_0
c  in DIMACS:
 11114 -11115  11116  270 -11117 0
 11114 -11115  11116  270 -11118 0
 11114 -11115  11116  270  11119 0

c  1-1 --> 0
c    (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0 ∧ -p_270) -> (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧ -b^{10, 28}_0)
c  in CNF:
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_2
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_1
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_0
c  in DIMACS:
 11114  11115 -11116  270 -11117 0
 11114  11115 -11116  270 -11118 0
 11114  11115 -11116  270 -11119 0

c  0-1 --> -1
c    (-b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧ -p_270) -> ( b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0)
c  in CNF:
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨  b^{10, 28}_2
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_1
c     b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨  b^{10, 28}_0
c  in DIMACS:
 11114  11115  11116  270  11117 0
 11114  11115  11116  270 -11118 0
 11114  11115  11116  270  11119 0

c  -1-1 --> -2
c    ( b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧  b^{10, 27}_0 ∧ -p_270) -> ( b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0)
c  in CNF:
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨  b^{10, 28}_2
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨  b^{10, 28}_1
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨  p_270 ∨ -b^{10, 28}_0
c  in DIMACS:
-11114  11115 -11116  270  11117 0
-11114  11115 -11116  270  11118 0
-11114  11115 -11116  270 -11119 0

c  -2-1 --> break 
c    ( b^{10, 27}_2 ∧  b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨  b^{10, 27}_0 ∨  p_270 ∨ break
c  in DIMACS:
-11114 -11115  11116  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 27}_2 ∧ -b^{10, 27}_1 ∧ -b^{10, 27}_0 ∧ true) 
c  in CNF:
c    -b^{10, 27}_2 ∨  b^{10, 27}_1 ∨  b^{10, 27}_0 ∨ false 
c  in DIMACS:
-11114  11115  11116  0

c  3 does not represent an automaton state.
c    -(-b^{10, 27}_2 ∧  b^{10, 27}_1 ∧  b^{10, 27}_0 ∧ true) 
c  in CNF:
c     b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ false 
c  in DIMACS:
 11114 -11115 -11116  0
c  -3 does not represent an automaton state.
c    -( b^{10, 27}_2 ∧  b^{10, 27}_1 ∧  b^{10, 27}_0 ∧ true) 
c  in CNF:
c    -b^{10, 27}_2 ∨ -b^{10, 27}_1 ∨ -b^{10, 27}_0 ∨ false 
c  in DIMACS:
-11114 -11115 -11116  0

c i = 28
c  -2+1 --> -1
c    ( b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧  p_280) -> ( b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0)
c  in CNF:
c    -b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨  b^{10, 29}_2
c    -b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_1
c    -b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨  b^{10, 29}_0
c  in DIMACS:
-11117 -11118  11119 -280  11120 0
-11117 -11118  11119 -280 -11121 0
-11117 -11118  11119 -280  11122 0

c  -1+1 --> 0
c    ( b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0 ∧  p_280) -> (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧ -b^{10, 29}_0)
c  in CNF:
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_2
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_1
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_0
c  in DIMACS:
-11117  11118 -11119 -280 -11120 0
-11117  11118 -11119 -280 -11121 0
-11117  11118 -11119 -280 -11122 0

c  0+1 --> 1
c    (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧  p_280) -> (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0)
c  in CNF:
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_2
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_1
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨  b^{10, 29}_0
c  in DIMACS:
 11117  11118  11119 -280 -11120 0
 11117  11118  11119 -280 -11121 0
 11117  11118  11119 -280  11122 0

c  1+1 --> 2
c    (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0 ∧  p_280) -> (-b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0)
c  in CNF:
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_2
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨  b^{10, 29}_1
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ -p_280 ∨ -b^{10, 29}_0
c  in DIMACS:
 11117  11118 -11119 -280 -11120 0
 11117  11118 -11119 -280  11121 0
 11117  11118 -11119 -280 -11122 0

c  2+1 --> break 
c    (-b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧  p_280) -> break
c  in CNF:
c     b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 11117 -11118  11119 -280 1162 0


c  2-1 --> 1
c    (-b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧ -p_280) -> (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0)
c  in CNF:
c     b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_2
c     b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_1
c     b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨  b^{10, 29}_0
c  in DIMACS:
 11117 -11118  11119  280 -11120 0
 11117 -11118  11119  280 -11121 0
 11117 -11118  11119  280  11122 0

c  1-1 --> 0
c    (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0 ∧ -p_280) -> (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧ -b^{10, 29}_0)
c  in CNF:
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_2
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_1
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_0
c  in DIMACS:
 11117  11118 -11119  280 -11120 0
 11117  11118 -11119  280 -11121 0
 11117  11118 -11119  280 -11122 0

c  0-1 --> -1
c    (-b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧ -p_280) -> ( b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0)
c  in CNF:
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨  b^{10, 29}_2
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_1
c     b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨  b^{10, 29}_0
c  in DIMACS:
 11117  11118  11119  280  11120 0
 11117  11118  11119  280 -11121 0
 11117  11118  11119  280  11122 0

c  -1-1 --> -2
c    ( b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧  b^{10, 28}_0 ∧ -p_280) -> ( b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0)
c  in CNF:
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨  b^{10, 29}_2
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨  b^{10, 29}_1
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨  p_280 ∨ -b^{10, 29}_0
c  in DIMACS:
-11117  11118 -11119  280  11120 0
-11117  11118 -11119  280  11121 0
-11117  11118 -11119  280 -11122 0

c  -2-1 --> break 
c    ( b^{10, 28}_2 ∧  b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨  b^{10, 28}_0 ∨  p_280 ∨ break
c  in DIMACS:
-11117 -11118  11119  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 28}_2 ∧ -b^{10, 28}_1 ∧ -b^{10, 28}_0 ∧ true) 
c  in CNF:
c    -b^{10, 28}_2 ∨  b^{10, 28}_1 ∨  b^{10, 28}_0 ∨ false 
c  in DIMACS:
-11117  11118  11119  0

c  3 does not represent an automaton state.
c    -(-b^{10, 28}_2 ∧  b^{10, 28}_1 ∧  b^{10, 28}_0 ∧ true) 
c  in CNF:
c     b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ false 
c  in DIMACS:
 11117 -11118 -11119  0
c  -3 does not represent an automaton state.
c    -( b^{10, 28}_2 ∧  b^{10, 28}_1 ∧  b^{10, 28}_0 ∧ true) 
c  in CNF:
c    -b^{10, 28}_2 ∨ -b^{10, 28}_1 ∨ -b^{10, 28}_0 ∨ false 
c  in DIMACS:
-11117 -11118 -11119  0

c i = 29
c  -2+1 --> -1
c    ( b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧  p_290) -> ( b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0)
c  in CNF:
c    -b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨  b^{10, 30}_2
c    -b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_1
c    -b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨  b^{10, 30}_0
c  in DIMACS:
-11120 -11121  11122 -290  11123 0
-11120 -11121  11122 -290 -11124 0
-11120 -11121  11122 -290  11125 0

c  -1+1 --> 0
c    ( b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0 ∧  p_290) -> (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧ -b^{10, 30}_0)
c  in CNF:
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_2
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_1
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_0
c  in DIMACS:
-11120  11121 -11122 -290 -11123 0
-11120  11121 -11122 -290 -11124 0
-11120  11121 -11122 -290 -11125 0

c  0+1 --> 1
c    (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧  p_290) -> (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0)
c  in CNF:
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_2
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_1
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨  b^{10, 30}_0
c  in DIMACS:
 11120  11121  11122 -290 -11123 0
 11120  11121  11122 -290 -11124 0
 11120  11121  11122 -290  11125 0

c  1+1 --> 2
c    (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0 ∧  p_290) -> (-b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0)
c  in CNF:
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_2
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨  b^{10, 30}_1
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ -p_290 ∨ -b^{10, 30}_0
c  in DIMACS:
 11120  11121 -11122 -290 -11123 0
 11120  11121 -11122 -290  11124 0
 11120  11121 -11122 -290 -11125 0

c  2+1 --> break 
c    (-b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧  p_290) -> break
c  in CNF:
c     b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 11120 -11121  11122 -290 1162 0


c  2-1 --> 1
c    (-b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧ -p_290) -> (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0)
c  in CNF:
c     b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_2
c     b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_1
c     b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨  b^{10, 30}_0
c  in DIMACS:
 11120 -11121  11122  290 -11123 0
 11120 -11121  11122  290 -11124 0
 11120 -11121  11122  290  11125 0

c  1-1 --> 0
c    (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0 ∧ -p_290) -> (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧ -b^{10, 30}_0)
c  in CNF:
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_2
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_1
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_0
c  in DIMACS:
 11120  11121 -11122  290 -11123 0
 11120  11121 -11122  290 -11124 0
 11120  11121 -11122  290 -11125 0

c  0-1 --> -1
c    (-b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧ -p_290) -> ( b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0)
c  in CNF:
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨  b^{10, 30}_2
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_1
c     b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨  b^{10, 30}_0
c  in DIMACS:
 11120  11121  11122  290  11123 0
 11120  11121  11122  290 -11124 0
 11120  11121  11122  290  11125 0

c  -1-1 --> -2
c    ( b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧  b^{10, 29}_0 ∧ -p_290) -> ( b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0)
c  in CNF:
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨  b^{10, 30}_2
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨  b^{10, 30}_1
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨  p_290 ∨ -b^{10, 30}_0
c  in DIMACS:
-11120  11121 -11122  290  11123 0
-11120  11121 -11122  290  11124 0
-11120  11121 -11122  290 -11125 0

c  -2-1 --> break 
c    ( b^{10, 29}_2 ∧  b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨  b^{10, 29}_0 ∨  p_290 ∨ break
c  in DIMACS:
-11120 -11121  11122  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 29}_2 ∧ -b^{10, 29}_1 ∧ -b^{10, 29}_0 ∧ true) 
c  in CNF:
c    -b^{10, 29}_2 ∨  b^{10, 29}_1 ∨  b^{10, 29}_0 ∨ false 
c  in DIMACS:
-11120  11121  11122  0

c  3 does not represent an automaton state.
c    -(-b^{10, 29}_2 ∧  b^{10, 29}_1 ∧  b^{10, 29}_0 ∧ true) 
c  in CNF:
c     b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ false 
c  in DIMACS:
 11120 -11121 -11122  0
c  -3 does not represent an automaton state.
c    -( b^{10, 29}_2 ∧  b^{10, 29}_1 ∧  b^{10, 29}_0 ∧ true) 
c  in CNF:
c    -b^{10, 29}_2 ∨ -b^{10, 29}_1 ∨ -b^{10, 29}_0 ∨ false 
c  in DIMACS:
-11120 -11121 -11122  0

c i = 30
c  -2+1 --> -1
c    ( b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧  p_300) -> ( b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0)
c  in CNF:
c    -b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨  b^{10, 31}_2
c    -b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_1
c    -b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨  b^{10, 31}_0
c  in DIMACS:
-11123 -11124  11125 -300  11126 0
-11123 -11124  11125 -300 -11127 0
-11123 -11124  11125 -300  11128 0

c  -1+1 --> 0
c    ( b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0 ∧  p_300) -> (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧ -b^{10, 31}_0)
c  in CNF:
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_2
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_1
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_0
c  in DIMACS:
-11123  11124 -11125 -300 -11126 0
-11123  11124 -11125 -300 -11127 0
-11123  11124 -11125 -300 -11128 0

c  0+1 --> 1
c    (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧  p_300) -> (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0)
c  in CNF:
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_2
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_1
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨  b^{10, 31}_0
c  in DIMACS:
 11123  11124  11125 -300 -11126 0
 11123  11124  11125 -300 -11127 0
 11123  11124  11125 -300  11128 0

c  1+1 --> 2
c    (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0 ∧  p_300) -> (-b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0)
c  in CNF:
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_2
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨  b^{10, 31}_1
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ -p_300 ∨ -b^{10, 31}_0
c  in DIMACS:
 11123  11124 -11125 -300 -11126 0
 11123  11124 -11125 -300  11127 0
 11123  11124 -11125 -300 -11128 0

c  2+1 --> break 
c    (-b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧  p_300) -> break
c  in CNF:
c     b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 11123 -11124  11125 -300 1162 0


c  2-1 --> 1
c    (-b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧ -p_300) -> (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0)
c  in CNF:
c     b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_2
c     b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_1
c     b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨  b^{10, 31}_0
c  in DIMACS:
 11123 -11124  11125  300 -11126 0
 11123 -11124  11125  300 -11127 0
 11123 -11124  11125  300  11128 0

c  1-1 --> 0
c    (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0 ∧ -p_300) -> (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧ -b^{10, 31}_0)
c  in CNF:
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_2
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_1
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_0
c  in DIMACS:
 11123  11124 -11125  300 -11126 0
 11123  11124 -11125  300 -11127 0
 11123  11124 -11125  300 -11128 0

c  0-1 --> -1
c    (-b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧ -p_300) -> ( b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0)
c  in CNF:
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨  b^{10, 31}_2
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_1
c     b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨  b^{10, 31}_0
c  in DIMACS:
 11123  11124  11125  300  11126 0
 11123  11124  11125  300 -11127 0
 11123  11124  11125  300  11128 0

c  -1-1 --> -2
c    ( b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧  b^{10, 30}_0 ∧ -p_300) -> ( b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0)
c  in CNF:
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨  b^{10, 31}_2
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨  b^{10, 31}_1
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨  p_300 ∨ -b^{10, 31}_0
c  in DIMACS:
-11123  11124 -11125  300  11126 0
-11123  11124 -11125  300  11127 0
-11123  11124 -11125  300 -11128 0

c  -2-1 --> break 
c    ( b^{10, 30}_2 ∧  b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨  b^{10, 30}_0 ∨  p_300 ∨ break
c  in DIMACS:
-11123 -11124  11125  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 30}_2 ∧ -b^{10, 30}_1 ∧ -b^{10, 30}_0 ∧ true) 
c  in CNF:
c    -b^{10, 30}_2 ∨  b^{10, 30}_1 ∨  b^{10, 30}_0 ∨ false 
c  in DIMACS:
-11123  11124  11125  0

c  3 does not represent an automaton state.
c    -(-b^{10, 30}_2 ∧  b^{10, 30}_1 ∧  b^{10, 30}_0 ∧ true) 
c  in CNF:
c     b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ false 
c  in DIMACS:
 11123 -11124 -11125  0
c  -3 does not represent an automaton state.
c    -( b^{10, 30}_2 ∧  b^{10, 30}_1 ∧  b^{10, 30}_0 ∧ true) 
c  in CNF:
c    -b^{10, 30}_2 ∨ -b^{10, 30}_1 ∨ -b^{10, 30}_0 ∨ false 
c  in DIMACS:
-11123 -11124 -11125  0

c i = 31
c  -2+1 --> -1
c    ( b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧  p_310) -> ( b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0)
c  in CNF:
c    -b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨  b^{10, 32}_2
c    -b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_1
c    -b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨  b^{10, 32}_0
c  in DIMACS:
-11126 -11127  11128 -310  11129 0
-11126 -11127  11128 -310 -11130 0
-11126 -11127  11128 -310  11131 0

c  -1+1 --> 0
c    ( b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0 ∧  p_310) -> (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧ -b^{10, 32}_0)
c  in CNF:
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_2
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_1
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_0
c  in DIMACS:
-11126  11127 -11128 -310 -11129 0
-11126  11127 -11128 -310 -11130 0
-11126  11127 -11128 -310 -11131 0

c  0+1 --> 1
c    (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧  p_310) -> (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0)
c  in CNF:
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_2
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_1
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨  b^{10, 32}_0
c  in DIMACS:
 11126  11127  11128 -310 -11129 0
 11126  11127  11128 -310 -11130 0
 11126  11127  11128 -310  11131 0

c  1+1 --> 2
c    (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0 ∧  p_310) -> (-b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0)
c  in CNF:
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_2
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨  b^{10, 32}_1
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ -p_310 ∨ -b^{10, 32}_0
c  in DIMACS:
 11126  11127 -11128 -310 -11129 0
 11126  11127 -11128 -310  11130 0
 11126  11127 -11128 -310 -11131 0

c  2+1 --> break 
c    (-b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧  p_310) -> break
c  in CNF:
c     b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 11126 -11127  11128 -310 1162 0


c  2-1 --> 1
c    (-b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧ -p_310) -> (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0)
c  in CNF:
c     b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_2
c     b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_1
c     b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨  b^{10, 32}_0
c  in DIMACS:
 11126 -11127  11128  310 -11129 0
 11126 -11127  11128  310 -11130 0
 11126 -11127  11128  310  11131 0

c  1-1 --> 0
c    (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0 ∧ -p_310) -> (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧ -b^{10, 32}_0)
c  in CNF:
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_2
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_1
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_0
c  in DIMACS:
 11126  11127 -11128  310 -11129 0
 11126  11127 -11128  310 -11130 0
 11126  11127 -11128  310 -11131 0

c  0-1 --> -1
c    (-b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧ -p_310) -> ( b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0)
c  in CNF:
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨  b^{10, 32}_2
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_1
c     b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨  b^{10, 32}_0
c  in DIMACS:
 11126  11127  11128  310  11129 0
 11126  11127  11128  310 -11130 0
 11126  11127  11128  310  11131 0

c  -1-1 --> -2
c    ( b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧  b^{10, 31}_0 ∧ -p_310) -> ( b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0)
c  in CNF:
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨  b^{10, 32}_2
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨  b^{10, 32}_1
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨  p_310 ∨ -b^{10, 32}_0
c  in DIMACS:
-11126  11127 -11128  310  11129 0
-11126  11127 -11128  310  11130 0
-11126  11127 -11128  310 -11131 0

c  -2-1 --> break 
c    ( b^{10, 31}_2 ∧  b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨  b^{10, 31}_0 ∨  p_310 ∨ break
c  in DIMACS:
-11126 -11127  11128  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 31}_2 ∧ -b^{10, 31}_1 ∧ -b^{10, 31}_0 ∧ true) 
c  in CNF:
c    -b^{10, 31}_2 ∨  b^{10, 31}_1 ∨  b^{10, 31}_0 ∨ false 
c  in DIMACS:
-11126  11127  11128  0

c  3 does not represent an automaton state.
c    -(-b^{10, 31}_2 ∧  b^{10, 31}_1 ∧  b^{10, 31}_0 ∧ true) 
c  in CNF:
c     b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ false 
c  in DIMACS:
 11126 -11127 -11128  0
c  -3 does not represent an automaton state.
c    -( b^{10, 31}_2 ∧  b^{10, 31}_1 ∧  b^{10, 31}_0 ∧ true) 
c  in CNF:
c    -b^{10, 31}_2 ∨ -b^{10, 31}_1 ∨ -b^{10, 31}_0 ∨ false 
c  in DIMACS:
-11126 -11127 -11128  0

c i = 32
c  -2+1 --> -1
c    ( b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧  p_320) -> ( b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0)
c  in CNF:
c    -b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨  b^{10, 33}_2
c    -b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_1
c    -b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨  b^{10, 33}_0
c  in DIMACS:
-11129 -11130  11131 -320  11132 0
-11129 -11130  11131 -320 -11133 0
-11129 -11130  11131 -320  11134 0

c  -1+1 --> 0
c    ( b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0 ∧  p_320) -> (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧ -b^{10, 33}_0)
c  in CNF:
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_2
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_1
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_0
c  in DIMACS:
-11129  11130 -11131 -320 -11132 0
-11129  11130 -11131 -320 -11133 0
-11129  11130 -11131 -320 -11134 0

c  0+1 --> 1
c    (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧  p_320) -> (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0)
c  in CNF:
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_2
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_1
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨  b^{10, 33}_0
c  in DIMACS:
 11129  11130  11131 -320 -11132 0
 11129  11130  11131 -320 -11133 0
 11129  11130  11131 -320  11134 0

c  1+1 --> 2
c    (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0 ∧  p_320) -> (-b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0)
c  in CNF:
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_2
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨  b^{10, 33}_1
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ -p_320 ∨ -b^{10, 33}_0
c  in DIMACS:
 11129  11130 -11131 -320 -11132 0
 11129  11130 -11131 -320  11133 0
 11129  11130 -11131 -320 -11134 0

c  2+1 --> break 
c    (-b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧  p_320) -> break
c  in CNF:
c     b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 11129 -11130  11131 -320 1162 0


c  2-1 --> 1
c    (-b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧ -p_320) -> (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0)
c  in CNF:
c     b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_2
c     b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_1
c     b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨  b^{10, 33}_0
c  in DIMACS:
 11129 -11130  11131  320 -11132 0
 11129 -11130  11131  320 -11133 0
 11129 -11130  11131  320  11134 0

c  1-1 --> 0
c    (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0 ∧ -p_320) -> (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧ -b^{10, 33}_0)
c  in CNF:
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_2
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_1
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_0
c  in DIMACS:
 11129  11130 -11131  320 -11132 0
 11129  11130 -11131  320 -11133 0
 11129  11130 -11131  320 -11134 0

c  0-1 --> -1
c    (-b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧ -p_320) -> ( b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0)
c  in CNF:
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨  b^{10, 33}_2
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_1
c     b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨  b^{10, 33}_0
c  in DIMACS:
 11129  11130  11131  320  11132 0
 11129  11130  11131  320 -11133 0
 11129  11130  11131  320  11134 0

c  -1-1 --> -2
c    ( b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧  b^{10, 32}_0 ∧ -p_320) -> ( b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0)
c  in CNF:
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨  b^{10, 33}_2
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨  b^{10, 33}_1
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨  p_320 ∨ -b^{10, 33}_0
c  in DIMACS:
-11129  11130 -11131  320  11132 0
-11129  11130 -11131  320  11133 0
-11129  11130 -11131  320 -11134 0

c  -2-1 --> break 
c    ( b^{10, 32}_2 ∧  b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨  b^{10, 32}_0 ∨  p_320 ∨ break
c  in DIMACS:
-11129 -11130  11131  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 32}_2 ∧ -b^{10, 32}_1 ∧ -b^{10, 32}_0 ∧ true) 
c  in CNF:
c    -b^{10, 32}_2 ∨  b^{10, 32}_1 ∨  b^{10, 32}_0 ∨ false 
c  in DIMACS:
-11129  11130  11131  0

c  3 does not represent an automaton state.
c    -(-b^{10, 32}_2 ∧  b^{10, 32}_1 ∧  b^{10, 32}_0 ∧ true) 
c  in CNF:
c     b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ false 
c  in DIMACS:
 11129 -11130 -11131  0
c  -3 does not represent an automaton state.
c    -( b^{10, 32}_2 ∧  b^{10, 32}_1 ∧  b^{10, 32}_0 ∧ true) 
c  in CNF:
c    -b^{10, 32}_2 ∨ -b^{10, 32}_1 ∨ -b^{10, 32}_0 ∨ false 
c  in DIMACS:
-11129 -11130 -11131  0

c i = 33
c  -2+1 --> -1
c    ( b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧  p_330) -> ( b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0)
c  in CNF:
c    -b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨  b^{10, 34}_2
c    -b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_1
c    -b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨  b^{10, 34}_0
c  in DIMACS:
-11132 -11133  11134 -330  11135 0
-11132 -11133  11134 -330 -11136 0
-11132 -11133  11134 -330  11137 0

c  -1+1 --> 0
c    ( b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0 ∧  p_330) -> (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧ -b^{10, 34}_0)
c  in CNF:
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_2
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_1
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_0
c  in DIMACS:
-11132  11133 -11134 -330 -11135 0
-11132  11133 -11134 -330 -11136 0
-11132  11133 -11134 -330 -11137 0

c  0+1 --> 1
c    (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧  p_330) -> (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0)
c  in CNF:
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_2
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_1
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨  b^{10, 34}_0
c  in DIMACS:
 11132  11133  11134 -330 -11135 0
 11132  11133  11134 -330 -11136 0
 11132  11133  11134 -330  11137 0

c  1+1 --> 2
c    (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0 ∧  p_330) -> (-b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0)
c  in CNF:
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_2
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨  b^{10, 34}_1
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ -p_330 ∨ -b^{10, 34}_0
c  in DIMACS:
 11132  11133 -11134 -330 -11135 0
 11132  11133 -11134 -330  11136 0
 11132  11133 -11134 -330 -11137 0

c  2+1 --> break 
c    (-b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧  p_330) -> break
c  in CNF:
c     b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 11132 -11133  11134 -330 1162 0


c  2-1 --> 1
c    (-b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧ -p_330) -> (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0)
c  in CNF:
c     b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_2
c     b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_1
c     b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨  b^{10, 34}_0
c  in DIMACS:
 11132 -11133  11134  330 -11135 0
 11132 -11133  11134  330 -11136 0
 11132 -11133  11134  330  11137 0

c  1-1 --> 0
c    (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0 ∧ -p_330) -> (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧ -b^{10, 34}_0)
c  in CNF:
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_2
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_1
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_0
c  in DIMACS:
 11132  11133 -11134  330 -11135 0
 11132  11133 -11134  330 -11136 0
 11132  11133 -11134  330 -11137 0

c  0-1 --> -1
c    (-b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧ -p_330) -> ( b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0)
c  in CNF:
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨  b^{10, 34}_2
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_1
c     b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨  b^{10, 34}_0
c  in DIMACS:
 11132  11133  11134  330  11135 0
 11132  11133  11134  330 -11136 0
 11132  11133  11134  330  11137 0

c  -1-1 --> -2
c    ( b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧  b^{10, 33}_0 ∧ -p_330) -> ( b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0)
c  in CNF:
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨  b^{10, 34}_2
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨  b^{10, 34}_1
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨  p_330 ∨ -b^{10, 34}_0
c  in DIMACS:
-11132  11133 -11134  330  11135 0
-11132  11133 -11134  330  11136 0
-11132  11133 -11134  330 -11137 0

c  -2-1 --> break 
c    ( b^{10, 33}_2 ∧  b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨  b^{10, 33}_0 ∨  p_330 ∨ break
c  in DIMACS:
-11132 -11133  11134  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 33}_2 ∧ -b^{10, 33}_1 ∧ -b^{10, 33}_0 ∧ true) 
c  in CNF:
c    -b^{10, 33}_2 ∨  b^{10, 33}_1 ∨  b^{10, 33}_0 ∨ false 
c  in DIMACS:
-11132  11133  11134  0

c  3 does not represent an automaton state.
c    -(-b^{10, 33}_2 ∧  b^{10, 33}_1 ∧  b^{10, 33}_0 ∧ true) 
c  in CNF:
c     b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ false 
c  in DIMACS:
 11132 -11133 -11134  0
c  -3 does not represent an automaton state.
c    -( b^{10, 33}_2 ∧  b^{10, 33}_1 ∧  b^{10, 33}_0 ∧ true) 
c  in CNF:
c    -b^{10, 33}_2 ∨ -b^{10, 33}_1 ∨ -b^{10, 33}_0 ∨ false 
c  in DIMACS:
-11132 -11133 -11134  0

c i = 34
c  -2+1 --> -1
c    ( b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧  p_340) -> ( b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0)
c  in CNF:
c    -b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨  b^{10, 35}_2
c    -b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_1
c    -b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨  b^{10, 35}_0
c  in DIMACS:
-11135 -11136  11137 -340  11138 0
-11135 -11136  11137 -340 -11139 0
-11135 -11136  11137 -340  11140 0

c  -1+1 --> 0
c    ( b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0 ∧  p_340) -> (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧ -b^{10, 35}_0)
c  in CNF:
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_2
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_1
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_0
c  in DIMACS:
-11135  11136 -11137 -340 -11138 0
-11135  11136 -11137 -340 -11139 0
-11135  11136 -11137 -340 -11140 0

c  0+1 --> 1
c    (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧  p_340) -> (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0)
c  in CNF:
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_2
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_1
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨  b^{10, 35}_0
c  in DIMACS:
 11135  11136  11137 -340 -11138 0
 11135  11136  11137 -340 -11139 0
 11135  11136  11137 -340  11140 0

c  1+1 --> 2
c    (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0 ∧  p_340) -> (-b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0)
c  in CNF:
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_2
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨  b^{10, 35}_1
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ -p_340 ∨ -b^{10, 35}_0
c  in DIMACS:
 11135  11136 -11137 -340 -11138 0
 11135  11136 -11137 -340  11139 0
 11135  11136 -11137 -340 -11140 0

c  2+1 --> break 
c    (-b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧  p_340) -> break
c  in CNF:
c     b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 11135 -11136  11137 -340 1162 0


c  2-1 --> 1
c    (-b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧ -p_340) -> (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0)
c  in CNF:
c     b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_2
c     b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_1
c     b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨  b^{10, 35}_0
c  in DIMACS:
 11135 -11136  11137  340 -11138 0
 11135 -11136  11137  340 -11139 0
 11135 -11136  11137  340  11140 0

c  1-1 --> 0
c    (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0 ∧ -p_340) -> (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧ -b^{10, 35}_0)
c  in CNF:
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_2
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_1
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_0
c  in DIMACS:
 11135  11136 -11137  340 -11138 0
 11135  11136 -11137  340 -11139 0
 11135  11136 -11137  340 -11140 0

c  0-1 --> -1
c    (-b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧ -p_340) -> ( b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0)
c  in CNF:
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨  b^{10, 35}_2
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_1
c     b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨  b^{10, 35}_0
c  in DIMACS:
 11135  11136  11137  340  11138 0
 11135  11136  11137  340 -11139 0
 11135  11136  11137  340  11140 0

c  -1-1 --> -2
c    ( b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧  b^{10, 34}_0 ∧ -p_340) -> ( b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0)
c  in CNF:
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨  b^{10, 35}_2
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨  b^{10, 35}_1
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨  p_340 ∨ -b^{10, 35}_0
c  in DIMACS:
-11135  11136 -11137  340  11138 0
-11135  11136 -11137  340  11139 0
-11135  11136 -11137  340 -11140 0

c  -2-1 --> break 
c    ( b^{10, 34}_2 ∧  b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨  b^{10, 34}_0 ∨  p_340 ∨ break
c  in DIMACS:
-11135 -11136  11137  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 34}_2 ∧ -b^{10, 34}_1 ∧ -b^{10, 34}_0 ∧ true) 
c  in CNF:
c    -b^{10, 34}_2 ∨  b^{10, 34}_1 ∨  b^{10, 34}_0 ∨ false 
c  in DIMACS:
-11135  11136  11137  0

c  3 does not represent an automaton state.
c    -(-b^{10, 34}_2 ∧  b^{10, 34}_1 ∧  b^{10, 34}_0 ∧ true) 
c  in CNF:
c     b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ false 
c  in DIMACS:
 11135 -11136 -11137  0
c  -3 does not represent an automaton state.
c    -( b^{10, 34}_2 ∧  b^{10, 34}_1 ∧  b^{10, 34}_0 ∧ true) 
c  in CNF:
c    -b^{10, 34}_2 ∨ -b^{10, 34}_1 ∨ -b^{10, 34}_0 ∨ false 
c  in DIMACS:
-11135 -11136 -11137  0

c i = 35
c  -2+1 --> -1
c    ( b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧  p_350) -> ( b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0)
c  in CNF:
c    -b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨  b^{10, 36}_2
c    -b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_1
c    -b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨  b^{10, 36}_0
c  in DIMACS:
-11138 -11139  11140 -350  11141 0
-11138 -11139  11140 -350 -11142 0
-11138 -11139  11140 -350  11143 0

c  -1+1 --> 0
c    ( b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0 ∧  p_350) -> (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧ -b^{10, 36}_0)
c  in CNF:
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_2
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_1
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_0
c  in DIMACS:
-11138  11139 -11140 -350 -11141 0
-11138  11139 -11140 -350 -11142 0
-11138  11139 -11140 -350 -11143 0

c  0+1 --> 1
c    (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧  p_350) -> (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0)
c  in CNF:
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_2
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_1
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨  b^{10, 36}_0
c  in DIMACS:
 11138  11139  11140 -350 -11141 0
 11138  11139  11140 -350 -11142 0
 11138  11139  11140 -350  11143 0

c  1+1 --> 2
c    (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0 ∧  p_350) -> (-b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0)
c  in CNF:
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_2
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨  b^{10, 36}_1
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ -p_350 ∨ -b^{10, 36}_0
c  in DIMACS:
 11138  11139 -11140 -350 -11141 0
 11138  11139 -11140 -350  11142 0
 11138  11139 -11140 -350 -11143 0

c  2+1 --> break 
c    (-b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧  p_350) -> break
c  in CNF:
c     b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 11138 -11139  11140 -350 1162 0


c  2-1 --> 1
c    (-b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧ -p_350) -> (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0)
c  in CNF:
c     b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_2
c     b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_1
c     b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨  b^{10, 36}_0
c  in DIMACS:
 11138 -11139  11140  350 -11141 0
 11138 -11139  11140  350 -11142 0
 11138 -11139  11140  350  11143 0

c  1-1 --> 0
c    (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0 ∧ -p_350) -> (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧ -b^{10, 36}_0)
c  in CNF:
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_2
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_1
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_0
c  in DIMACS:
 11138  11139 -11140  350 -11141 0
 11138  11139 -11140  350 -11142 0
 11138  11139 -11140  350 -11143 0

c  0-1 --> -1
c    (-b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧ -p_350) -> ( b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0)
c  in CNF:
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨  b^{10, 36}_2
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_1
c     b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨  b^{10, 36}_0
c  in DIMACS:
 11138  11139  11140  350  11141 0
 11138  11139  11140  350 -11142 0
 11138  11139  11140  350  11143 0

c  -1-1 --> -2
c    ( b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧  b^{10, 35}_0 ∧ -p_350) -> ( b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0)
c  in CNF:
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨  b^{10, 36}_2
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨  b^{10, 36}_1
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨  p_350 ∨ -b^{10, 36}_0
c  in DIMACS:
-11138  11139 -11140  350  11141 0
-11138  11139 -11140  350  11142 0
-11138  11139 -11140  350 -11143 0

c  -2-1 --> break 
c    ( b^{10, 35}_2 ∧  b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨  b^{10, 35}_0 ∨  p_350 ∨ break
c  in DIMACS:
-11138 -11139  11140  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 35}_2 ∧ -b^{10, 35}_1 ∧ -b^{10, 35}_0 ∧ true) 
c  in CNF:
c    -b^{10, 35}_2 ∨  b^{10, 35}_1 ∨  b^{10, 35}_0 ∨ false 
c  in DIMACS:
-11138  11139  11140  0

c  3 does not represent an automaton state.
c    -(-b^{10, 35}_2 ∧  b^{10, 35}_1 ∧  b^{10, 35}_0 ∧ true) 
c  in CNF:
c     b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ false 
c  in DIMACS:
 11138 -11139 -11140  0
c  -3 does not represent an automaton state.
c    -( b^{10, 35}_2 ∧  b^{10, 35}_1 ∧  b^{10, 35}_0 ∧ true) 
c  in CNF:
c    -b^{10, 35}_2 ∨ -b^{10, 35}_1 ∨ -b^{10, 35}_0 ∨ false 
c  in DIMACS:
-11138 -11139 -11140  0

c i = 36
c  -2+1 --> -1
c    ( b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧  p_360) -> ( b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0)
c  in CNF:
c    -b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨  b^{10, 37}_2
c    -b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_1
c    -b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨  b^{10, 37}_0
c  in DIMACS:
-11141 -11142  11143 -360  11144 0
-11141 -11142  11143 -360 -11145 0
-11141 -11142  11143 -360  11146 0

c  -1+1 --> 0
c    ( b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0 ∧  p_360) -> (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧ -b^{10, 37}_0)
c  in CNF:
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_2
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_1
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_0
c  in DIMACS:
-11141  11142 -11143 -360 -11144 0
-11141  11142 -11143 -360 -11145 0
-11141  11142 -11143 -360 -11146 0

c  0+1 --> 1
c    (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧  p_360) -> (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0)
c  in CNF:
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_2
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_1
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨  b^{10, 37}_0
c  in DIMACS:
 11141  11142  11143 -360 -11144 0
 11141  11142  11143 -360 -11145 0
 11141  11142  11143 -360  11146 0

c  1+1 --> 2
c    (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0 ∧  p_360) -> (-b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0)
c  in CNF:
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_2
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨  b^{10, 37}_1
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ -p_360 ∨ -b^{10, 37}_0
c  in DIMACS:
 11141  11142 -11143 -360 -11144 0
 11141  11142 -11143 -360  11145 0
 11141  11142 -11143 -360 -11146 0

c  2+1 --> break 
c    (-b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧  p_360) -> break
c  in CNF:
c     b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 11141 -11142  11143 -360 1162 0


c  2-1 --> 1
c    (-b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧ -p_360) -> (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0)
c  in CNF:
c     b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_2
c     b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_1
c     b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨  b^{10, 37}_0
c  in DIMACS:
 11141 -11142  11143  360 -11144 0
 11141 -11142  11143  360 -11145 0
 11141 -11142  11143  360  11146 0

c  1-1 --> 0
c    (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0 ∧ -p_360) -> (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧ -b^{10, 37}_0)
c  in CNF:
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_2
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_1
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_0
c  in DIMACS:
 11141  11142 -11143  360 -11144 0
 11141  11142 -11143  360 -11145 0
 11141  11142 -11143  360 -11146 0

c  0-1 --> -1
c    (-b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧ -p_360) -> ( b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0)
c  in CNF:
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨  b^{10, 37}_2
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_1
c     b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨  b^{10, 37}_0
c  in DIMACS:
 11141  11142  11143  360  11144 0
 11141  11142  11143  360 -11145 0
 11141  11142  11143  360  11146 0

c  -1-1 --> -2
c    ( b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧  b^{10, 36}_0 ∧ -p_360) -> ( b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0)
c  in CNF:
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨  b^{10, 37}_2
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨  b^{10, 37}_1
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨  p_360 ∨ -b^{10, 37}_0
c  in DIMACS:
-11141  11142 -11143  360  11144 0
-11141  11142 -11143  360  11145 0
-11141  11142 -11143  360 -11146 0

c  -2-1 --> break 
c    ( b^{10, 36}_2 ∧  b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨  b^{10, 36}_0 ∨  p_360 ∨ break
c  in DIMACS:
-11141 -11142  11143  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 36}_2 ∧ -b^{10, 36}_1 ∧ -b^{10, 36}_0 ∧ true) 
c  in CNF:
c    -b^{10, 36}_2 ∨  b^{10, 36}_1 ∨  b^{10, 36}_0 ∨ false 
c  in DIMACS:
-11141  11142  11143  0

c  3 does not represent an automaton state.
c    -(-b^{10, 36}_2 ∧  b^{10, 36}_1 ∧  b^{10, 36}_0 ∧ true) 
c  in CNF:
c     b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ false 
c  in DIMACS:
 11141 -11142 -11143  0
c  -3 does not represent an automaton state.
c    -( b^{10, 36}_2 ∧  b^{10, 36}_1 ∧  b^{10, 36}_0 ∧ true) 
c  in CNF:
c    -b^{10, 36}_2 ∨ -b^{10, 36}_1 ∨ -b^{10, 36}_0 ∨ false 
c  in DIMACS:
-11141 -11142 -11143  0

c i = 37
c  -2+1 --> -1
c    ( b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧  p_370) -> ( b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0)
c  in CNF:
c    -b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨  b^{10, 38}_2
c    -b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_1
c    -b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨  b^{10, 38}_0
c  in DIMACS:
-11144 -11145  11146 -370  11147 0
-11144 -11145  11146 -370 -11148 0
-11144 -11145  11146 -370  11149 0

c  -1+1 --> 0
c    ( b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0 ∧  p_370) -> (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧ -b^{10, 38}_0)
c  in CNF:
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_2
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_1
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_0
c  in DIMACS:
-11144  11145 -11146 -370 -11147 0
-11144  11145 -11146 -370 -11148 0
-11144  11145 -11146 -370 -11149 0

c  0+1 --> 1
c    (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧  p_370) -> (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0)
c  in CNF:
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_2
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_1
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨  b^{10, 38}_0
c  in DIMACS:
 11144  11145  11146 -370 -11147 0
 11144  11145  11146 -370 -11148 0
 11144  11145  11146 -370  11149 0

c  1+1 --> 2
c    (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0 ∧  p_370) -> (-b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0)
c  in CNF:
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_2
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨  b^{10, 38}_1
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ -p_370 ∨ -b^{10, 38}_0
c  in DIMACS:
 11144  11145 -11146 -370 -11147 0
 11144  11145 -11146 -370  11148 0
 11144  11145 -11146 -370 -11149 0

c  2+1 --> break 
c    (-b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧  p_370) -> break
c  in CNF:
c     b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 11144 -11145  11146 -370 1162 0


c  2-1 --> 1
c    (-b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧ -p_370) -> (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0)
c  in CNF:
c     b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_2
c     b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_1
c     b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨  b^{10, 38}_0
c  in DIMACS:
 11144 -11145  11146  370 -11147 0
 11144 -11145  11146  370 -11148 0
 11144 -11145  11146  370  11149 0

c  1-1 --> 0
c    (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0 ∧ -p_370) -> (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧ -b^{10, 38}_0)
c  in CNF:
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_2
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_1
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_0
c  in DIMACS:
 11144  11145 -11146  370 -11147 0
 11144  11145 -11146  370 -11148 0
 11144  11145 -11146  370 -11149 0

c  0-1 --> -1
c    (-b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧ -p_370) -> ( b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0)
c  in CNF:
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨  b^{10, 38}_2
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_1
c     b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨  b^{10, 38}_0
c  in DIMACS:
 11144  11145  11146  370  11147 0
 11144  11145  11146  370 -11148 0
 11144  11145  11146  370  11149 0

c  -1-1 --> -2
c    ( b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧  b^{10, 37}_0 ∧ -p_370) -> ( b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0)
c  in CNF:
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨  b^{10, 38}_2
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨  b^{10, 38}_1
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨  p_370 ∨ -b^{10, 38}_0
c  in DIMACS:
-11144  11145 -11146  370  11147 0
-11144  11145 -11146  370  11148 0
-11144  11145 -11146  370 -11149 0

c  -2-1 --> break 
c    ( b^{10, 37}_2 ∧  b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨  b^{10, 37}_0 ∨  p_370 ∨ break
c  in DIMACS:
-11144 -11145  11146  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 37}_2 ∧ -b^{10, 37}_1 ∧ -b^{10, 37}_0 ∧ true) 
c  in CNF:
c    -b^{10, 37}_2 ∨  b^{10, 37}_1 ∨  b^{10, 37}_0 ∨ false 
c  in DIMACS:
-11144  11145  11146  0

c  3 does not represent an automaton state.
c    -(-b^{10, 37}_2 ∧  b^{10, 37}_1 ∧  b^{10, 37}_0 ∧ true) 
c  in CNF:
c     b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ false 
c  in DIMACS:
 11144 -11145 -11146  0
c  -3 does not represent an automaton state.
c    -( b^{10, 37}_2 ∧  b^{10, 37}_1 ∧  b^{10, 37}_0 ∧ true) 
c  in CNF:
c    -b^{10, 37}_2 ∨ -b^{10, 37}_1 ∨ -b^{10, 37}_0 ∨ false 
c  in DIMACS:
-11144 -11145 -11146  0

c i = 38
c  -2+1 --> -1
c    ( b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧  p_380) -> ( b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0)
c  in CNF:
c    -b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨  b^{10, 39}_2
c    -b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_1
c    -b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨  b^{10, 39}_0
c  in DIMACS:
-11147 -11148  11149 -380  11150 0
-11147 -11148  11149 -380 -11151 0
-11147 -11148  11149 -380  11152 0

c  -1+1 --> 0
c    ( b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0 ∧  p_380) -> (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧ -b^{10, 39}_0)
c  in CNF:
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_2
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_1
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_0
c  in DIMACS:
-11147  11148 -11149 -380 -11150 0
-11147  11148 -11149 -380 -11151 0
-11147  11148 -11149 -380 -11152 0

c  0+1 --> 1
c    (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧  p_380) -> (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0)
c  in CNF:
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_2
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_1
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨  b^{10, 39}_0
c  in DIMACS:
 11147  11148  11149 -380 -11150 0
 11147  11148  11149 -380 -11151 0
 11147  11148  11149 -380  11152 0

c  1+1 --> 2
c    (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0 ∧  p_380) -> (-b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0)
c  in CNF:
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_2
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨  b^{10, 39}_1
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ -p_380 ∨ -b^{10, 39}_0
c  in DIMACS:
 11147  11148 -11149 -380 -11150 0
 11147  11148 -11149 -380  11151 0
 11147  11148 -11149 -380 -11152 0

c  2+1 --> break 
c    (-b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧  p_380) -> break
c  in CNF:
c     b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 11147 -11148  11149 -380 1162 0


c  2-1 --> 1
c    (-b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧ -p_380) -> (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0)
c  in CNF:
c     b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_2
c     b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_1
c     b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨  b^{10, 39}_0
c  in DIMACS:
 11147 -11148  11149  380 -11150 0
 11147 -11148  11149  380 -11151 0
 11147 -11148  11149  380  11152 0

c  1-1 --> 0
c    (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0 ∧ -p_380) -> (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧ -b^{10, 39}_0)
c  in CNF:
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_2
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_1
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_0
c  in DIMACS:
 11147  11148 -11149  380 -11150 0
 11147  11148 -11149  380 -11151 0
 11147  11148 -11149  380 -11152 0

c  0-1 --> -1
c    (-b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧ -p_380) -> ( b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0)
c  in CNF:
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨  b^{10, 39}_2
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_1
c     b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨  b^{10, 39}_0
c  in DIMACS:
 11147  11148  11149  380  11150 0
 11147  11148  11149  380 -11151 0
 11147  11148  11149  380  11152 0

c  -1-1 --> -2
c    ( b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧  b^{10, 38}_0 ∧ -p_380) -> ( b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0)
c  in CNF:
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨  b^{10, 39}_2
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨  b^{10, 39}_1
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨  p_380 ∨ -b^{10, 39}_0
c  in DIMACS:
-11147  11148 -11149  380  11150 0
-11147  11148 -11149  380  11151 0
-11147  11148 -11149  380 -11152 0

c  -2-1 --> break 
c    ( b^{10, 38}_2 ∧  b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨  b^{10, 38}_0 ∨  p_380 ∨ break
c  in DIMACS:
-11147 -11148  11149  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 38}_2 ∧ -b^{10, 38}_1 ∧ -b^{10, 38}_0 ∧ true) 
c  in CNF:
c    -b^{10, 38}_2 ∨  b^{10, 38}_1 ∨  b^{10, 38}_0 ∨ false 
c  in DIMACS:
-11147  11148  11149  0

c  3 does not represent an automaton state.
c    -(-b^{10, 38}_2 ∧  b^{10, 38}_1 ∧  b^{10, 38}_0 ∧ true) 
c  in CNF:
c     b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ false 
c  in DIMACS:
 11147 -11148 -11149  0
c  -3 does not represent an automaton state.
c    -( b^{10, 38}_2 ∧  b^{10, 38}_1 ∧  b^{10, 38}_0 ∧ true) 
c  in CNF:
c    -b^{10, 38}_2 ∨ -b^{10, 38}_1 ∨ -b^{10, 38}_0 ∨ false 
c  in DIMACS:
-11147 -11148 -11149  0

c i = 39
c  -2+1 --> -1
c    ( b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧  p_390) -> ( b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0)
c  in CNF:
c    -b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨  b^{10, 40}_2
c    -b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_1
c    -b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨  b^{10, 40}_0
c  in DIMACS:
-11150 -11151  11152 -390  11153 0
-11150 -11151  11152 -390 -11154 0
-11150 -11151  11152 -390  11155 0

c  -1+1 --> 0
c    ( b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0 ∧  p_390) -> (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧ -b^{10, 40}_0)
c  in CNF:
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_2
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_1
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_0
c  in DIMACS:
-11150  11151 -11152 -390 -11153 0
-11150  11151 -11152 -390 -11154 0
-11150  11151 -11152 -390 -11155 0

c  0+1 --> 1
c    (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧  p_390) -> (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0)
c  in CNF:
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_2
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_1
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨  b^{10, 40}_0
c  in DIMACS:
 11150  11151  11152 -390 -11153 0
 11150  11151  11152 -390 -11154 0
 11150  11151  11152 -390  11155 0

c  1+1 --> 2
c    (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0 ∧  p_390) -> (-b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0)
c  in CNF:
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_2
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨  b^{10, 40}_1
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ -p_390 ∨ -b^{10, 40}_0
c  in DIMACS:
 11150  11151 -11152 -390 -11153 0
 11150  11151 -11152 -390  11154 0
 11150  11151 -11152 -390 -11155 0

c  2+1 --> break 
c    (-b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧  p_390) -> break
c  in CNF:
c     b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 11150 -11151  11152 -390 1162 0


c  2-1 --> 1
c    (-b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧ -p_390) -> (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0)
c  in CNF:
c     b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_2
c     b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_1
c     b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨  b^{10, 40}_0
c  in DIMACS:
 11150 -11151  11152  390 -11153 0
 11150 -11151  11152  390 -11154 0
 11150 -11151  11152  390  11155 0

c  1-1 --> 0
c    (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0 ∧ -p_390) -> (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧ -b^{10, 40}_0)
c  in CNF:
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_2
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_1
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_0
c  in DIMACS:
 11150  11151 -11152  390 -11153 0
 11150  11151 -11152  390 -11154 0
 11150  11151 -11152  390 -11155 0

c  0-1 --> -1
c    (-b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧ -p_390) -> ( b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0)
c  in CNF:
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨  b^{10, 40}_2
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_1
c     b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨  b^{10, 40}_0
c  in DIMACS:
 11150  11151  11152  390  11153 0
 11150  11151  11152  390 -11154 0
 11150  11151  11152  390  11155 0

c  -1-1 --> -2
c    ( b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧  b^{10, 39}_0 ∧ -p_390) -> ( b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0)
c  in CNF:
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨  b^{10, 40}_2
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨  b^{10, 40}_1
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨  p_390 ∨ -b^{10, 40}_0
c  in DIMACS:
-11150  11151 -11152  390  11153 0
-11150  11151 -11152  390  11154 0
-11150  11151 -11152  390 -11155 0

c  -2-1 --> break 
c    ( b^{10, 39}_2 ∧  b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨  b^{10, 39}_0 ∨  p_390 ∨ break
c  in DIMACS:
-11150 -11151  11152  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 39}_2 ∧ -b^{10, 39}_1 ∧ -b^{10, 39}_0 ∧ true) 
c  in CNF:
c    -b^{10, 39}_2 ∨  b^{10, 39}_1 ∨  b^{10, 39}_0 ∨ false 
c  in DIMACS:
-11150  11151  11152  0

c  3 does not represent an automaton state.
c    -(-b^{10, 39}_2 ∧  b^{10, 39}_1 ∧  b^{10, 39}_0 ∧ true) 
c  in CNF:
c     b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ false 
c  in DIMACS:
 11150 -11151 -11152  0
c  -3 does not represent an automaton state.
c    -( b^{10, 39}_2 ∧  b^{10, 39}_1 ∧  b^{10, 39}_0 ∧ true) 
c  in CNF:
c    -b^{10, 39}_2 ∨ -b^{10, 39}_1 ∨ -b^{10, 39}_0 ∨ false 
c  in DIMACS:
-11150 -11151 -11152  0

c i = 40
c  -2+1 --> -1
c    ( b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧  p_400) -> ( b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0)
c  in CNF:
c    -b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨  b^{10, 41}_2
c    -b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_1
c    -b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨  b^{10, 41}_0
c  in DIMACS:
-11153 -11154  11155 -400  11156 0
-11153 -11154  11155 -400 -11157 0
-11153 -11154  11155 -400  11158 0

c  -1+1 --> 0
c    ( b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0 ∧  p_400) -> (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧ -b^{10, 41}_0)
c  in CNF:
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_2
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_1
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_0
c  in DIMACS:
-11153  11154 -11155 -400 -11156 0
-11153  11154 -11155 -400 -11157 0
-11153  11154 -11155 -400 -11158 0

c  0+1 --> 1
c    (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧  p_400) -> (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0)
c  in CNF:
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_2
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_1
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨  b^{10, 41}_0
c  in DIMACS:
 11153  11154  11155 -400 -11156 0
 11153  11154  11155 -400 -11157 0
 11153  11154  11155 -400  11158 0

c  1+1 --> 2
c    (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0 ∧  p_400) -> (-b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0)
c  in CNF:
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_2
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨  b^{10, 41}_1
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ -p_400 ∨ -b^{10, 41}_0
c  in DIMACS:
 11153  11154 -11155 -400 -11156 0
 11153  11154 -11155 -400  11157 0
 11153  11154 -11155 -400 -11158 0

c  2+1 --> break 
c    (-b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧  p_400) -> break
c  in CNF:
c     b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 11153 -11154  11155 -400 1162 0


c  2-1 --> 1
c    (-b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧ -p_400) -> (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0)
c  in CNF:
c     b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_2
c     b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_1
c     b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨  b^{10, 41}_0
c  in DIMACS:
 11153 -11154  11155  400 -11156 0
 11153 -11154  11155  400 -11157 0
 11153 -11154  11155  400  11158 0

c  1-1 --> 0
c    (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0 ∧ -p_400) -> (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧ -b^{10, 41}_0)
c  in CNF:
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_2
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_1
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_0
c  in DIMACS:
 11153  11154 -11155  400 -11156 0
 11153  11154 -11155  400 -11157 0
 11153  11154 -11155  400 -11158 0

c  0-1 --> -1
c    (-b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧ -p_400) -> ( b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0)
c  in CNF:
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨  b^{10, 41}_2
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_1
c     b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨  b^{10, 41}_0
c  in DIMACS:
 11153  11154  11155  400  11156 0
 11153  11154  11155  400 -11157 0
 11153  11154  11155  400  11158 0

c  -1-1 --> -2
c    ( b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧  b^{10, 40}_0 ∧ -p_400) -> ( b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0)
c  in CNF:
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨  b^{10, 41}_2
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨  b^{10, 41}_1
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨  p_400 ∨ -b^{10, 41}_0
c  in DIMACS:
-11153  11154 -11155  400  11156 0
-11153  11154 -11155  400  11157 0
-11153  11154 -11155  400 -11158 0

c  -2-1 --> break 
c    ( b^{10, 40}_2 ∧  b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨  b^{10, 40}_0 ∨  p_400 ∨ break
c  in DIMACS:
-11153 -11154  11155  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 40}_2 ∧ -b^{10, 40}_1 ∧ -b^{10, 40}_0 ∧ true) 
c  in CNF:
c    -b^{10, 40}_2 ∨  b^{10, 40}_1 ∨  b^{10, 40}_0 ∨ false 
c  in DIMACS:
-11153  11154  11155  0

c  3 does not represent an automaton state.
c    -(-b^{10, 40}_2 ∧  b^{10, 40}_1 ∧  b^{10, 40}_0 ∧ true) 
c  in CNF:
c     b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ false 
c  in DIMACS:
 11153 -11154 -11155  0
c  -3 does not represent an automaton state.
c    -( b^{10, 40}_2 ∧  b^{10, 40}_1 ∧  b^{10, 40}_0 ∧ true) 
c  in CNF:
c    -b^{10, 40}_2 ∨ -b^{10, 40}_1 ∨ -b^{10, 40}_0 ∨ false 
c  in DIMACS:
-11153 -11154 -11155  0

c i = 41
c  -2+1 --> -1
c    ( b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧  p_410) -> ( b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0)
c  in CNF:
c    -b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨  b^{10, 42}_2
c    -b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_1
c    -b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨  b^{10, 42}_0
c  in DIMACS:
-11156 -11157  11158 -410  11159 0
-11156 -11157  11158 -410 -11160 0
-11156 -11157  11158 -410  11161 0

c  -1+1 --> 0
c    ( b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0 ∧  p_410) -> (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧ -b^{10, 42}_0)
c  in CNF:
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_2
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_1
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_0
c  in DIMACS:
-11156  11157 -11158 -410 -11159 0
-11156  11157 -11158 -410 -11160 0
-11156  11157 -11158 -410 -11161 0

c  0+1 --> 1
c    (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧  p_410) -> (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0)
c  in CNF:
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_2
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_1
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨  b^{10, 42}_0
c  in DIMACS:
 11156  11157  11158 -410 -11159 0
 11156  11157  11158 -410 -11160 0
 11156  11157  11158 -410  11161 0

c  1+1 --> 2
c    (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0 ∧  p_410) -> (-b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0)
c  in CNF:
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_2
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨  b^{10, 42}_1
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ -p_410 ∨ -b^{10, 42}_0
c  in DIMACS:
 11156  11157 -11158 -410 -11159 0
 11156  11157 -11158 -410  11160 0
 11156  11157 -11158 -410 -11161 0

c  2+1 --> break 
c    (-b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧  p_410) -> break
c  in CNF:
c     b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 11156 -11157  11158 -410 1162 0


c  2-1 --> 1
c    (-b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧ -p_410) -> (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0)
c  in CNF:
c     b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_2
c     b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_1
c     b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨  b^{10, 42}_0
c  in DIMACS:
 11156 -11157  11158  410 -11159 0
 11156 -11157  11158  410 -11160 0
 11156 -11157  11158  410  11161 0

c  1-1 --> 0
c    (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0 ∧ -p_410) -> (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧ -b^{10, 42}_0)
c  in CNF:
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_2
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_1
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_0
c  in DIMACS:
 11156  11157 -11158  410 -11159 0
 11156  11157 -11158  410 -11160 0
 11156  11157 -11158  410 -11161 0

c  0-1 --> -1
c    (-b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧ -p_410) -> ( b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0)
c  in CNF:
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨  b^{10, 42}_2
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_1
c     b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨  b^{10, 42}_0
c  in DIMACS:
 11156  11157  11158  410  11159 0
 11156  11157  11158  410 -11160 0
 11156  11157  11158  410  11161 0

c  -1-1 --> -2
c    ( b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧  b^{10, 41}_0 ∧ -p_410) -> ( b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0)
c  in CNF:
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨  b^{10, 42}_2
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨  b^{10, 42}_1
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨  p_410 ∨ -b^{10, 42}_0
c  in DIMACS:
-11156  11157 -11158  410  11159 0
-11156  11157 -11158  410  11160 0
-11156  11157 -11158  410 -11161 0

c  -2-1 --> break 
c    ( b^{10, 41}_2 ∧  b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨  b^{10, 41}_0 ∨  p_410 ∨ break
c  in DIMACS:
-11156 -11157  11158  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 41}_2 ∧ -b^{10, 41}_1 ∧ -b^{10, 41}_0 ∧ true) 
c  in CNF:
c    -b^{10, 41}_2 ∨  b^{10, 41}_1 ∨  b^{10, 41}_0 ∨ false 
c  in DIMACS:
-11156  11157  11158  0

c  3 does not represent an automaton state.
c    -(-b^{10, 41}_2 ∧  b^{10, 41}_1 ∧  b^{10, 41}_0 ∧ true) 
c  in CNF:
c     b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ false 
c  in DIMACS:
 11156 -11157 -11158  0
c  -3 does not represent an automaton state.
c    -( b^{10, 41}_2 ∧  b^{10, 41}_1 ∧  b^{10, 41}_0 ∧ true) 
c  in CNF:
c    -b^{10, 41}_2 ∨ -b^{10, 41}_1 ∨ -b^{10, 41}_0 ∨ false 
c  in DIMACS:
-11156 -11157 -11158  0

c i = 42
c  -2+1 --> -1
c    ( b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧  p_420) -> ( b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0)
c  in CNF:
c    -b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨  b^{10, 43}_2
c    -b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_1
c    -b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨  b^{10, 43}_0
c  in DIMACS:
-11159 -11160  11161 -420  11162 0
-11159 -11160  11161 -420 -11163 0
-11159 -11160  11161 -420  11164 0

c  -1+1 --> 0
c    ( b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0 ∧  p_420) -> (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧ -b^{10, 43}_0)
c  in CNF:
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_2
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_1
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_0
c  in DIMACS:
-11159  11160 -11161 -420 -11162 0
-11159  11160 -11161 -420 -11163 0
-11159  11160 -11161 -420 -11164 0

c  0+1 --> 1
c    (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧  p_420) -> (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0)
c  in CNF:
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_2
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_1
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨  b^{10, 43}_0
c  in DIMACS:
 11159  11160  11161 -420 -11162 0
 11159  11160  11161 -420 -11163 0
 11159  11160  11161 -420  11164 0

c  1+1 --> 2
c    (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0 ∧  p_420) -> (-b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0)
c  in CNF:
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_2
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨  b^{10, 43}_1
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ -p_420 ∨ -b^{10, 43}_0
c  in DIMACS:
 11159  11160 -11161 -420 -11162 0
 11159  11160 -11161 -420  11163 0
 11159  11160 -11161 -420 -11164 0

c  2+1 --> break 
c    (-b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧  p_420) -> break
c  in CNF:
c     b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 11159 -11160  11161 -420 1162 0


c  2-1 --> 1
c    (-b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧ -p_420) -> (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0)
c  in CNF:
c     b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_2
c     b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_1
c     b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨  b^{10, 43}_0
c  in DIMACS:
 11159 -11160  11161  420 -11162 0
 11159 -11160  11161  420 -11163 0
 11159 -11160  11161  420  11164 0

c  1-1 --> 0
c    (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0 ∧ -p_420) -> (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧ -b^{10, 43}_0)
c  in CNF:
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_2
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_1
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_0
c  in DIMACS:
 11159  11160 -11161  420 -11162 0
 11159  11160 -11161  420 -11163 0
 11159  11160 -11161  420 -11164 0

c  0-1 --> -1
c    (-b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧ -p_420) -> ( b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0)
c  in CNF:
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨  b^{10, 43}_2
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_1
c     b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨  b^{10, 43}_0
c  in DIMACS:
 11159  11160  11161  420  11162 0
 11159  11160  11161  420 -11163 0
 11159  11160  11161  420  11164 0

c  -1-1 --> -2
c    ( b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧  b^{10, 42}_0 ∧ -p_420) -> ( b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0)
c  in CNF:
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨  b^{10, 43}_2
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨  b^{10, 43}_1
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨  p_420 ∨ -b^{10, 43}_0
c  in DIMACS:
-11159  11160 -11161  420  11162 0
-11159  11160 -11161  420  11163 0
-11159  11160 -11161  420 -11164 0

c  -2-1 --> break 
c    ( b^{10, 42}_2 ∧  b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨  b^{10, 42}_0 ∨  p_420 ∨ break
c  in DIMACS:
-11159 -11160  11161  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 42}_2 ∧ -b^{10, 42}_1 ∧ -b^{10, 42}_0 ∧ true) 
c  in CNF:
c    -b^{10, 42}_2 ∨  b^{10, 42}_1 ∨  b^{10, 42}_0 ∨ false 
c  in DIMACS:
-11159  11160  11161  0

c  3 does not represent an automaton state.
c    -(-b^{10, 42}_2 ∧  b^{10, 42}_1 ∧  b^{10, 42}_0 ∧ true) 
c  in CNF:
c     b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ false 
c  in DIMACS:
 11159 -11160 -11161  0
c  -3 does not represent an automaton state.
c    -( b^{10, 42}_2 ∧  b^{10, 42}_1 ∧  b^{10, 42}_0 ∧ true) 
c  in CNF:
c    -b^{10, 42}_2 ∨ -b^{10, 42}_1 ∨ -b^{10, 42}_0 ∨ false 
c  in DIMACS:
-11159 -11160 -11161  0

c i = 43
c  -2+1 --> -1
c    ( b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧  p_430) -> ( b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0)
c  in CNF:
c    -b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨  b^{10, 44}_2
c    -b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_1
c    -b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨  b^{10, 44}_0
c  in DIMACS:
-11162 -11163  11164 -430  11165 0
-11162 -11163  11164 -430 -11166 0
-11162 -11163  11164 -430  11167 0

c  -1+1 --> 0
c    ( b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0 ∧  p_430) -> (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧ -b^{10, 44}_0)
c  in CNF:
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_2
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_1
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_0
c  in DIMACS:
-11162  11163 -11164 -430 -11165 0
-11162  11163 -11164 -430 -11166 0
-11162  11163 -11164 -430 -11167 0

c  0+1 --> 1
c    (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧  p_430) -> (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0)
c  in CNF:
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_2
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_1
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨  b^{10, 44}_0
c  in DIMACS:
 11162  11163  11164 -430 -11165 0
 11162  11163  11164 -430 -11166 0
 11162  11163  11164 -430  11167 0

c  1+1 --> 2
c    (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0 ∧  p_430) -> (-b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0)
c  in CNF:
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_2
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨  b^{10, 44}_1
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ -p_430 ∨ -b^{10, 44}_0
c  in DIMACS:
 11162  11163 -11164 -430 -11165 0
 11162  11163 -11164 -430  11166 0
 11162  11163 -11164 -430 -11167 0

c  2+1 --> break 
c    (-b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧  p_430) -> break
c  in CNF:
c     b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 11162 -11163  11164 -430 1162 0


c  2-1 --> 1
c    (-b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧ -p_430) -> (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0)
c  in CNF:
c     b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_2
c     b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_1
c     b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨  b^{10, 44}_0
c  in DIMACS:
 11162 -11163  11164  430 -11165 0
 11162 -11163  11164  430 -11166 0
 11162 -11163  11164  430  11167 0

c  1-1 --> 0
c    (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0 ∧ -p_430) -> (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧ -b^{10, 44}_0)
c  in CNF:
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_2
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_1
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_0
c  in DIMACS:
 11162  11163 -11164  430 -11165 0
 11162  11163 -11164  430 -11166 0
 11162  11163 -11164  430 -11167 0

c  0-1 --> -1
c    (-b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧ -p_430) -> ( b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0)
c  in CNF:
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨  b^{10, 44}_2
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_1
c     b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨  b^{10, 44}_0
c  in DIMACS:
 11162  11163  11164  430  11165 0
 11162  11163  11164  430 -11166 0
 11162  11163  11164  430  11167 0

c  -1-1 --> -2
c    ( b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧  b^{10, 43}_0 ∧ -p_430) -> ( b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0)
c  in CNF:
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨  b^{10, 44}_2
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨  b^{10, 44}_1
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨  p_430 ∨ -b^{10, 44}_0
c  in DIMACS:
-11162  11163 -11164  430  11165 0
-11162  11163 -11164  430  11166 0
-11162  11163 -11164  430 -11167 0

c  -2-1 --> break 
c    ( b^{10, 43}_2 ∧  b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨  b^{10, 43}_0 ∨  p_430 ∨ break
c  in DIMACS:
-11162 -11163  11164  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 43}_2 ∧ -b^{10, 43}_1 ∧ -b^{10, 43}_0 ∧ true) 
c  in CNF:
c    -b^{10, 43}_2 ∨  b^{10, 43}_1 ∨  b^{10, 43}_0 ∨ false 
c  in DIMACS:
-11162  11163  11164  0

c  3 does not represent an automaton state.
c    -(-b^{10, 43}_2 ∧  b^{10, 43}_1 ∧  b^{10, 43}_0 ∧ true) 
c  in CNF:
c     b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ false 
c  in DIMACS:
 11162 -11163 -11164  0
c  -3 does not represent an automaton state.
c    -( b^{10, 43}_2 ∧  b^{10, 43}_1 ∧  b^{10, 43}_0 ∧ true) 
c  in CNF:
c    -b^{10, 43}_2 ∨ -b^{10, 43}_1 ∨ -b^{10, 43}_0 ∨ false 
c  in DIMACS:
-11162 -11163 -11164  0

c i = 44
c  -2+1 --> -1
c    ( b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧  p_440) -> ( b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0)
c  in CNF:
c    -b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨  b^{10, 45}_2
c    -b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_1
c    -b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨  b^{10, 45}_0
c  in DIMACS:
-11165 -11166  11167 -440  11168 0
-11165 -11166  11167 -440 -11169 0
-11165 -11166  11167 -440  11170 0

c  -1+1 --> 0
c    ( b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0 ∧  p_440) -> (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧ -b^{10, 45}_0)
c  in CNF:
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_2
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_1
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_0
c  in DIMACS:
-11165  11166 -11167 -440 -11168 0
-11165  11166 -11167 -440 -11169 0
-11165  11166 -11167 -440 -11170 0

c  0+1 --> 1
c    (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧  p_440) -> (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0)
c  in CNF:
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_2
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_1
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨  b^{10, 45}_0
c  in DIMACS:
 11165  11166  11167 -440 -11168 0
 11165  11166  11167 -440 -11169 0
 11165  11166  11167 -440  11170 0

c  1+1 --> 2
c    (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0 ∧  p_440) -> (-b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0)
c  in CNF:
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_2
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨  b^{10, 45}_1
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ -p_440 ∨ -b^{10, 45}_0
c  in DIMACS:
 11165  11166 -11167 -440 -11168 0
 11165  11166 -11167 -440  11169 0
 11165  11166 -11167 -440 -11170 0

c  2+1 --> break 
c    (-b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧  p_440) -> break
c  in CNF:
c     b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 11165 -11166  11167 -440 1162 0


c  2-1 --> 1
c    (-b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧ -p_440) -> (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0)
c  in CNF:
c     b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_2
c     b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_1
c     b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨  b^{10, 45}_0
c  in DIMACS:
 11165 -11166  11167  440 -11168 0
 11165 -11166  11167  440 -11169 0
 11165 -11166  11167  440  11170 0

c  1-1 --> 0
c    (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0 ∧ -p_440) -> (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧ -b^{10, 45}_0)
c  in CNF:
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_2
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_1
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_0
c  in DIMACS:
 11165  11166 -11167  440 -11168 0
 11165  11166 -11167  440 -11169 0
 11165  11166 -11167  440 -11170 0

c  0-1 --> -1
c    (-b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧ -p_440) -> ( b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0)
c  in CNF:
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨  b^{10, 45}_2
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_1
c     b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨  b^{10, 45}_0
c  in DIMACS:
 11165  11166  11167  440  11168 0
 11165  11166  11167  440 -11169 0
 11165  11166  11167  440  11170 0

c  -1-1 --> -2
c    ( b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧  b^{10, 44}_0 ∧ -p_440) -> ( b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0)
c  in CNF:
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨  b^{10, 45}_2
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨  b^{10, 45}_1
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨  p_440 ∨ -b^{10, 45}_0
c  in DIMACS:
-11165  11166 -11167  440  11168 0
-11165  11166 -11167  440  11169 0
-11165  11166 -11167  440 -11170 0

c  -2-1 --> break 
c    ( b^{10, 44}_2 ∧  b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨  b^{10, 44}_0 ∨  p_440 ∨ break
c  in DIMACS:
-11165 -11166  11167  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 44}_2 ∧ -b^{10, 44}_1 ∧ -b^{10, 44}_0 ∧ true) 
c  in CNF:
c    -b^{10, 44}_2 ∨  b^{10, 44}_1 ∨  b^{10, 44}_0 ∨ false 
c  in DIMACS:
-11165  11166  11167  0

c  3 does not represent an automaton state.
c    -(-b^{10, 44}_2 ∧  b^{10, 44}_1 ∧  b^{10, 44}_0 ∧ true) 
c  in CNF:
c     b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ false 
c  in DIMACS:
 11165 -11166 -11167  0
c  -3 does not represent an automaton state.
c    -( b^{10, 44}_2 ∧  b^{10, 44}_1 ∧  b^{10, 44}_0 ∧ true) 
c  in CNF:
c    -b^{10, 44}_2 ∨ -b^{10, 44}_1 ∨ -b^{10, 44}_0 ∨ false 
c  in DIMACS:
-11165 -11166 -11167  0

c i = 45
c  -2+1 --> -1
c    ( b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧  p_450) -> ( b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0)
c  in CNF:
c    -b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨  b^{10, 46}_2
c    -b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_1
c    -b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨  b^{10, 46}_0
c  in DIMACS:
-11168 -11169  11170 -450  11171 0
-11168 -11169  11170 -450 -11172 0
-11168 -11169  11170 -450  11173 0

c  -1+1 --> 0
c    ( b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0 ∧  p_450) -> (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧ -b^{10, 46}_0)
c  in CNF:
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_2
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_1
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_0
c  in DIMACS:
-11168  11169 -11170 -450 -11171 0
-11168  11169 -11170 -450 -11172 0
-11168  11169 -11170 -450 -11173 0

c  0+1 --> 1
c    (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧  p_450) -> (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0)
c  in CNF:
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_2
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_1
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨  b^{10, 46}_0
c  in DIMACS:
 11168  11169  11170 -450 -11171 0
 11168  11169  11170 -450 -11172 0
 11168  11169  11170 -450  11173 0

c  1+1 --> 2
c    (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0 ∧  p_450) -> (-b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0)
c  in CNF:
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_2
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨  b^{10, 46}_1
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ -p_450 ∨ -b^{10, 46}_0
c  in DIMACS:
 11168  11169 -11170 -450 -11171 0
 11168  11169 -11170 -450  11172 0
 11168  11169 -11170 -450 -11173 0

c  2+1 --> break 
c    (-b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧  p_450) -> break
c  in CNF:
c     b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 11168 -11169  11170 -450 1162 0


c  2-1 --> 1
c    (-b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧ -p_450) -> (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0)
c  in CNF:
c     b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_2
c     b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_1
c     b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨  b^{10, 46}_0
c  in DIMACS:
 11168 -11169  11170  450 -11171 0
 11168 -11169  11170  450 -11172 0
 11168 -11169  11170  450  11173 0

c  1-1 --> 0
c    (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0 ∧ -p_450) -> (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧ -b^{10, 46}_0)
c  in CNF:
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_2
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_1
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_0
c  in DIMACS:
 11168  11169 -11170  450 -11171 0
 11168  11169 -11170  450 -11172 0
 11168  11169 -11170  450 -11173 0

c  0-1 --> -1
c    (-b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧ -p_450) -> ( b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0)
c  in CNF:
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨  b^{10, 46}_2
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_1
c     b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨  b^{10, 46}_0
c  in DIMACS:
 11168  11169  11170  450  11171 0
 11168  11169  11170  450 -11172 0
 11168  11169  11170  450  11173 0

c  -1-1 --> -2
c    ( b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧  b^{10, 45}_0 ∧ -p_450) -> ( b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0)
c  in CNF:
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨  b^{10, 46}_2
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨  b^{10, 46}_1
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨  p_450 ∨ -b^{10, 46}_0
c  in DIMACS:
-11168  11169 -11170  450  11171 0
-11168  11169 -11170  450  11172 0
-11168  11169 -11170  450 -11173 0

c  -2-1 --> break 
c    ( b^{10, 45}_2 ∧  b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨  b^{10, 45}_0 ∨  p_450 ∨ break
c  in DIMACS:
-11168 -11169  11170  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 45}_2 ∧ -b^{10, 45}_1 ∧ -b^{10, 45}_0 ∧ true) 
c  in CNF:
c    -b^{10, 45}_2 ∨  b^{10, 45}_1 ∨  b^{10, 45}_0 ∨ false 
c  in DIMACS:
-11168  11169  11170  0

c  3 does not represent an automaton state.
c    -(-b^{10, 45}_2 ∧  b^{10, 45}_1 ∧  b^{10, 45}_0 ∧ true) 
c  in CNF:
c     b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ false 
c  in DIMACS:
 11168 -11169 -11170  0
c  -3 does not represent an automaton state.
c    -( b^{10, 45}_2 ∧  b^{10, 45}_1 ∧  b^{10, 45}_0 ∧ true) 
c  in CNF:
c    -b^{10, 45}_2 ∨ -b^{10, 45}_1 ∨ -b^{10, 45}_0 ∨ false 
c  in DIMACS:
-11168 -11169 -11170  0

c i = 46
c  -2+1 --> -1
c    ( b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧  p_460) -> ( b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0)
c  in CNF:
c    -b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨  b^{10, 47}_2
c    -b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_1
c    -b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨  b^{10, 47}_0
c  in DIMACS:
-11171 -11172  11173 -460  11174 0
-11171 -11172  11173 -460 -11175 0
-11171 -11172  11173 -460  11176 0

c  -1+1 --> 0
c    ( b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0 ∧  p_460) -> (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧ -b^{10, 47}_0)
c  in CNF:
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_2
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_1
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_0
c  in DIMACS:
-11171  11172 -11173 -460 -11174 0
-11171  11172 -11173 -460 -11175 0
-11171  11172 -11173 -460 -11176 0

c  0+1 --> 1
c    (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧  p_460) -> (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0)
c  in CNF:
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_2
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_1
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨  b^{10, 47}_0
c  in DIMACS:
 11171  11172  11173 -460 -11174 0
 11171  11172  11173 -460 -11175 0
 11171  11172  11173 -460  11176 0

c  1+1 --> 2
c    (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0 ∧  p_460) -> (-b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0)
c  in CNF:
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_2
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨  b^{10, 47}_1
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ -p_460 ∨ -b^{10, 47}_0
c  in DIMACS:
 11171  11172 -11173 -460 -11174 0
 11171  11172 -11173 -460  11175 0
 11171  11172 -11173 -460 -11176 0

c  2+1 --> break 
c    (-b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧  p_460) -> break
c  in CNF:
c     b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 11171 -11172  11173 -460 1162 0


c  2-1 --> 1
c    (-b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧ -p_460) -> (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0)
c  in CNF:
c     b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_2
c     b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_1
c     b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨  b^{10, 47}_0
c  in DIMACS:
 11171 -11172  11173  460 -11174 0
 11171 -11172  11173  460 -11175 0
 11171 -11172  11173  460  11176 0

c  1-1 --> 0
c    (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0 ∧ -p_460) -> (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧ -b^{10, 47}_0)
c  in CNF:
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_2
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_1
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_0
c  in DIMACS:
 11171  11172 -11173  460 -11174 0
 11171  11172 -11173  460 -11175 0
 11171  11172 -11173  460 -11176 0

c  0-1 --> -1
c    (-b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧ -p_460) -> ( b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0)
c  in CNF:
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨  b^{10, 47}_2
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_1
c     b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨  b^{10, 47}_0
c  in DIMACS:
 11171  11172  11173  460  11174 0
 11171  11172  11173  460 -11175 0
 11171  11172  11173  460  11176 0

c  -1-1 --> -2
c    ( b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧  b^{10, 46}_0 ∧ -p_460) -> ( b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0)
c  in CNF:
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨  b^{10, 47}_2
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨  b^{10, 47}_1
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨  p_460 ∨ -b^{10, 47}_0
c  in DIMACS:
-11171  11172 -11173  460  11174 0
-11171  11172 -11173  460  11175 0
-11171  11172 -11173  460 -11176 0

c  -2-1 --> break 
c    ( b^{10, 46}_2 ∧  b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨  b^{10, 46}_0 ∨  p_460 ∨ break
c  in DIMACS:
-11171 -11172  11173  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 46}_2 ∧ -b^{10, 46}_1 ∧ -b^{10, 46}_0 ∧ true) 
c  in CNF:
c    -b^{10, 46}_2 ∨  b^{10, 46}_1 ∨  b^{10, 46}_0 ∨ false 
c  in DIMACS:
-11171  11172  11173  0

c  3 does not represent an automaton state.
c    -(-b^{10, 46}_2 ∧  b^{10, 46}_1 ∧  b^{10, 46}_0 ∧ true) 
c  in CNF:
c     b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ false 
c  in DIMACS:
 11171 -11172 -11173  0
c  -3 does not represent an automaton state.
c    -( b^{10, 46}_2 ∧  b^{10, 46}_1 ∧  b^{10, 46}_0 ∧ true) 
c  in CNF:
c    -b^{10, 46}_2 ∨ -b^{10, 46}_1 ∨ -b^{10, 46}_0 ∨ false 
c  in DIMACS:
-11171 -11172 -11173  0

c i = 47
c  -2+1 --> -1
c    ( b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧  p_470) -> ( b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0)
c  in CNF:
c    -b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨  b^{10, 48}_2
c    -b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_1
c    -b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨  b^{10, 48}_0
c  in DIMACS:
-11174 -11175  11176 -470  11177 0
-11174 -11175  11176 -470 -11178 0
-11174 -11175  11176 -470  11179 0

c  -1+1 --> 0
c    ( b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0 ∧  p_470) -> (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧ -b^{10, 48}_0)
c  in CNF:
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_2
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_1
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_0
c  in DIMACS:
-11174  11175 -11176 -470 -11177 0
-11174  11175 -11176 -470 -11178 0
-11174  11175 -11176 -470 -11179 0

c  0+1 --> 1
c    (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧  p_470) -> (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0)
c  in CNF:
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_2
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_1
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨  b^{10, 48}_0
c  in DIMACS:
 11174  11175  11176 -470 -11177 0
 11174  11175  11176 -470 -11178 0
 11174  11175  11176 -470  11179 0

c  1+1 --> 2
c    (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0 ∧  p_470) -> (-b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0)
c  in CNF:
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_2
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨  b^{10, 48}_1
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ -p_470 ∨ -b^{10, 48}_0
c  in DIMACS:
 11174  11175 -11176 -470 -11177 0
 11174  11175 -11176 -470  11178 0
 11174  11175 -11176 -470 -11179 0

c  2+1 --> break 
c    (-b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧  p_470) -> break
c  in CNF:
c     b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 11174 -11175  11176 -470 1162 0


c  2-1 --> 1
c    (-b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧ -p_470) -> (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0)
c  in CNF:
c     b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_2
c     b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_1
c     b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨  b^{10, 48}_0
c  in DIMACS:
 11174 -11175  11176  470 -11177 0
 11174 -11175  11176  470 -11178 0
 11174 -11175  11176  470  11179 0

c  1-1 --> 0
c    (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0 ∧ -p_470) -> (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧ -b^{10, 48}_0)
c  in CNF:
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_2
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_1
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_0
c  in DIMACS:
 11174  11175 -11176  470 -11177 0
 11174  11175 -11176  470 -11178 0
 11174  11175 -11176  470 -11179 0

c  0-1 --> -1
c    (-b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧ -p_470) -> ( b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0)
c  in CNF:
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨  b^{10, 48}_2
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_1
c     b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨  b^{10, 48}_0
c  in DIMACS:
 11174  11175  11176  470  11177 0
 11174  11175  11176  470 -11178 0
 11174  11175  11176  470  11179 0

c  -1-1 --> -2
c    ( b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧  b^{10, 47}_0 ∧ -p_470) -> ( b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0)
c  in CNF:
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨  b^{10, 48}_2
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨  b^{10, 48}_1
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨  p_470 ∨ -b^{10, 48}_0
c  in DIMACS:
-11174  11175 -11176  470  11177 0
-11174  11175 -11176  470  11178 0
-11174  11175 -11176  470 -11179 0

c  -2-1 --> break 
c    ( b^{10, 47}_2 ∧  b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨  b^{10, 47}_0 ∨  p_470 ∨ break
c  in DIMACS:
-11174 -11175  11176  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 47}_2 ∧ -b^{10, 47}_1 ∧ -b^{10, 47}_0 ∧ true) 
c  in CNF:
c    -b^{10, 47}_2 ∨  b^{10, 47}_1 ∨  b^{10, 47}_0 ∨ false 
c  in DIMACS:
-11174  11175  11176  0

c  3 does not represent an automaton state.
c    -(-b^{10, 47}_2 ∧  b^{10, 47}_1 ∧  b^{10, 47}_0 ∧ true) 
c  in CNF:
c     b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ false 
c  in DIMACS:
 11174 -11175 -11176  0
c  -3 does not represent an automaton state.
c    -( b^{10, 47}_2 ∧  b^{10, 47}_1 ∧  b^{10, 47}_0 ∧ true) 
c  in CNF:
c    -b^{10, 47}_2 ∨ -b^{10, 47}_1 ∨ -b^{10, 47}_0 ∨ false 
c  in DIMACS:
-11174 -11175 -11176  0

c i = 48
c  -2+1 --> -1
c    ( b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧  p_480) -> ( b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0)
c  in CNF:
c    -b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨  b^{10, 49}_2
c    -b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_1
c    -b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨  b^{10, 49}_0
c  in DIMACS:
-11177 -11178  11179 -480  11180 0
-11177 -11178  11179 -480 -11181 0
-11177 -11178  11179 -480  11182 0

c  -1+1 --> 0
c    ( b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0 ∧  p_480) -> (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧ -b^{10, 49}_0)
c  in CNF:
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_2
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_1
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_0
c  in DIMACS:
-11177  11178 -11179 -480 -11180 0
-11177  11178 -11179 -480 -11181 0
-11177  11178 -11179 -480 -11182 0

c  0+1 --> 1
c    (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧  p_480) -> (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0)
c  in CNF:
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_2
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_1
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨  b^{10, 49}_0
c  in DIMACS:
 11177  11178  11179 -480 -11180 0
 11177  11178  11179 -480 -11181 0
 11177  11178  11179 -480  11182 0

c  1+1 --> 2
c    (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0 ∧  p_480) -> (-b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0)
c  in CNF:
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_2
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨  b^{10, 49}_1
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ -p_480 ∨ -b^{10, 49}_0
c  in DIMACS:
 11177  11178 -11179 -480 -11180 0
 11177  11178 -11179 -480  11181 0
 11177  11178 -11179 -480 -11182 0

c  2+1 --> break 
c    (-b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧  p_480) -> break
c  in CNF:
c     b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 11177 -11178  11179 -480 1162 0


c  2-1 --> 1
c    (-b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧ -p_480) -> (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0)
c  in CNF:
c     b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_2
c     b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_1
c     b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨  b^{10, 49}_0
c  in DIMACS:
 11177 -11178  11179  480 -11180 0
 11177 -11178  11179  480 -11181 0
 11177 -11178  11179  480  11182 0

c  1-1 --> 0
c    (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0 ∧ -p_480) -> (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧ -b^{10, 49}_0)
c  in CNF:
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_2
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_1
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_0
c  in DIMACS:
 11177  11178 -11179  480 -11180 0
 11177  11178 -11179  480 -11181 0
 11177  11178 -11179  480 -11182 0

c  0-1 --> -1
c    (-b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧ -p_480) -> ( b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0)
c  in CNF:
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨  b^{10, 49}_2
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_1
c     b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨  b^{10, 49}_0
c  in DIMACS:
 11177  11178  11179  480  11180 0
 11177  11178  11179  480 -11181 0
 11177  11178  11179  480  11182 0

c  -1-1 --> -2
c    ( b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧  b^{10, 48}_0 ∧ -p_480) -> ( b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0)
c  in CNF:
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨  b^{10, 49}_2
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨  b^{10, 49}_1
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨  p_480 ∨ -b^{10, 49}_0
c  in DIMACS:
-11177  11178 -11179  480  11180 0
-11177  11178 -11179  480  11181 0
-11177  11178 -11179  480 -11182 0

c  -2-1 --> break 
c    ( b^{10, 48}_2 ∧  b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨  b^{10, 48}_0 ∨  p_480 ∨ break
c  in DIMACS:
-11177 -11178  11179  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 48}_2 ∧ -b^{10, 48}_1 ∧ -b^{10, 48}_0 ∧ true) 
c  in CNF:
c    -b^{10, 48}_2 ∨  b^{10, 48}_1 ∨  b^{10, 48}_0 ∨ false 
c  in DIMACS:
-11177  11178  11179  0

c  3 does not represent an automaton state.
c    -(-b^{10, 48}_2 ∧  b^{10, 48}_1 ∧  b^{10, 48}_0 ∧ true) 
c  in CNF:
c     b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ false 
c  in DIMACS:
 11177 -11178 -11179  0
c  -3 does not represent an automaton state.
c    -( b^{10, 48}_2 ∧  b^{10, 48}_1 ∧  b^{10, 48}_0 ∧ true) 
c  in CNF:
c    -b^{10, 48}_2 ∨ -b^{10, 48}_1 ∨ -b^{10, 48}_0 ∨ false 
c  in DIMACS:
-11177 -11178 -11179  0

c i = 49
c  -2+1 --> -1
c    ( b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧  p_490) -> ( b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0)
c  in CNF:
c    -b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨  b^{10, 50}_2
c    -b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_1
c    -b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨  b^{10, 50}_0
c  in DIMACS:
-11180 -11181  11182 -490  11183 0
-11180 -11181  11182 -490 -11184 0
-11180 -11181  11182 -490  11185 0

c  -1+1 --> 0
c    ( b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0 ∧  p_490) -> (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧ -b^{10, 50}_0)
c  in CNF:
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_2
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_1
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_0
c  in DIMACS:
-11180  11181 -11182 -490 -11183 0
-11180  11181 -11182 -490 -11184 0
-11180  11181 -11182 -490 -11185 0

c  0+1 --> 1
c    (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧  p_490) -> (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0)
c  in CNF:
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_2
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_1
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨  b^{10, 50}_0
c  in DIMACS:
 11180  11181  11182 -490 -11183 0
 11180  11181  11182 -490 -11184 0
 11180  11181  11182 -490  11185 0

c  1+1 --> 2
c    (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0 ∧  p_490) -> (-b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0)
c  in CNF:
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_2
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨  b^{10, 50}_1
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ -p_490 ∨ -b^{10, 50}_0
c  in DIMACS:
 11180  11181 -11182 -490 -11183 0
 11180  11181 -11182 -490  11184 0
 11180  11181 -11182 -490 -11185 0

c  2+1 --> break 
c    (-b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧  p_490) -> break
c  in CNF:
c     b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 11180 -11181  11182 -490 1162 0


c  2-1 --> 1
c    (-b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧ -p_490) -> (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0)
c  in CNF:
c     b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_2
c     b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_1
c     b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨  b^{10, 50}_0
c  in DIMACS:
 11180 -11181  11182  490 -11183 0
 11180 -11181  11182  490 -11184 0
 11180 -11181  11182  490  11185 0

c  1-1 --> 0
c    (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0 ∧ -p_490) -> (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧ -b^{10, 50}_0)
c  in CNF:
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_2
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_1
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_0
c  in DIMACS:
 11180  11181 -11182  490 -11183 0
 11180  11181 -11182  490 -11184 0
 11180  11181 -11182  490 -11185 0

c  0-1 --> -1
c    (-b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧ -p_490) -> ( b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0)
c  in CNF:
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨  b^{10, 50}_2
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_1
c     b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨  b^{10, 50}_0
c  in DIMACS:
 11180  11181  11182  490  11183 0
 11180  11181  11182  490 -11184 0
 11180  11181  11182  490  11185 0

c  -1-1 --> -2
c    ( b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧  b^{10, 49}_0 ∧ -p_490) -> ( b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0)
c  in CNF:
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨  b^{10, 50}_2
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨  b^{10, 50}_1
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨  p_490 ∨ -b^{10, 50}_0
c  in DIMACS:
-11180  11181 -11182  490  11183 0
-11180  11181 -11182  490  11184 0
-11180  11181 -11182  490 -11185 0

c  -2-1 --> break 
c    ( b^{10, 49}_2 ∧  b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨  b^{10, 49}_0 ∨  p_490 ∨ break
c  in DIMACS:
-11180 -11181  11182  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 49}_2 ∧ -b^{10, 49}_1 ∧ -b^{10, 49}_0 ∧ true) 
c  in CNF:
c    -b^{10, 49}_2 ∨  b^{10, 49}_1 ∨  b^{10, 49}_0 ∨ false 
c  in DIMACS:
-11180  11181  11182  0

c  3 does not represent an automaton state.
c    -(-b^{10, 49}_2 ∧  b^{10, 49}_1 ∧  b^{10, 49}_0 ∧ true) 
c  in CNF:
c     b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ false 
c  in DIMACS:
 11180 -11181 -11182  0
c  -3 does not represent an automaton state.
c    -( b^{10, 49}_2 ∧  b^{10, 49}_1 ∧  b^{10, 49}_0 ∧ true) 
c  in CNF:
c    -b^{10, 49}_2 ∨ -b^{10, 49}_1 ∨ -b^{10, 49}_0 ∨ false 
c  in DIMACS:
-11180 -11181 -11182  0

c i = 50
c  -2+1 --> -1
c    ( b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧  p_500) -> ( b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0)
c  in CNF:
c    -b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨  b^{10, 51}_2
c    -b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_1
c    -b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨  b^{10, 51}_0
c  in DIMACS:
-11183 -11184  11185 -500  11186 0
-11183 -11184  11185 -500 -11187 0
-11183 -11184  11185 -500  11188 0

c  -1+1 --> 0
c    ( b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0 ∧  p_500) -> (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧ -b^{10, 51}_0)
c  in CNF:
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_2
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_1
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_0
c  in DIMACS:
-11183  11184 -11185 -500 -11186 0
-11183  11184 -11185 -500 -11187 0
-11183  11184 -11185 -500 -11188 0

c  0+1 --> 1
c    (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧  p_500) -> (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0)
c  in CNF:
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_2
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_1
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨  b^{10, 51}_0
c  in DIMACS:
 11183  11184  11185 -500 -11186 0
 11183  11184  11185 -500 -11187 0
 11183  11184  11185 -500  11188 0

c  1+1 --> 2
c    (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0 ∧  p_500) -> (-b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0)
c  in CNF:
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_2
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨  b^{10, 51}_1
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ -p_500 ∨ -b^{10, 51}_0
c  in DIMACS:
 11183  11184 -11185 -500 -11186 0
 11183  11184 -11185 -500  11187 0
 11183  11184 -11185 -500 -11188 0

c  2+1 --> break 
c    (-b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧  p_500) -> break
c  in CNF:
c     b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 11183 -11184  11185 -500 1162 0


c  2-1 --> 1
c    (-b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧ -p_500) -> (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0)
c  in CNF:
c     b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_2
c     b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_1
c     b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨  b^{10, 51}_0
c  in DIMACS:
 11183 -11184  11185  500 -11186 0
 11183 -11184  11185  500 -11187 0
 11183 -11184  11185  500  11188 0

c  1-1 --> 0
c    (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0 ∧ -p_500) -> (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧ -b^{10, 51}_0)
c  in CNF:
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_2
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_1
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_0
c  in DIMACS:
 11183  11184 -11185  500 -11186 0
 11183  11184 -11185  500 -11187 0
 11183  11184 -11185  500 -11188 0

c  0-1 --> -1
c    (-b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧ -p_500) -> ( b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0)
c  in CNF:
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨  b^{10, 51}_2
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_1
c     b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨  b^{10, 51}_0
c  in DIMACS:
 11183  11184  11185  500  11186 0
 11183  11184  11185  500 -11187 0
 11183  11184  11185  500  11188 0

c  -1-1 --> -2
c    ( b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧  b^{10, 50}_0 ∧ -p_500) -> ( b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0)
c  in CNF:
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨  b^{10, 51}_2
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨  b^{10, 51}_1
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨  p_500 ∨ -b^{10, 51}_0
c  in DIMACS:
-11183  11184 -11185  500  11186 0
-11183  11184 -11185  500  11187 0
-11183  11184 -11185  500 -11188 0

c  -2-1 --> break 
c    ( b^{10, 50}_2 ∧  b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨  b^{10, 50}_0 ∨  p_500 ∨ break
c  in DIMACS:
-11183 -11184  11185  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 50}_2 ∧ -b^{10, 50}_1 ∧ -b^{10, 50}_0 ∧ true) 
c  in CNF:
c    -b^{10, 50}_2 ∨  b^{10, 50}_1 ∨  b^{10, 50}_0 ∨ false 
c  in DIMACS:
-11183  11184  11185  0

c  3 does not represent an automaton state.
c    -(-b^{10, 50}_2 ∧  b^{10, 50}_1 ∧  b^{10, 50}_0 ∧ true) 
c  in CNF:
c     b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ false 
c  in DIMACS:
 11183 -11184 -11185  0
c  -3 does not represent an automaton state.
c    -( b^{10, 50}_2 ∧  b^{10, 50}_1 ∧  b^{10, 50}_0 ∧ true) 
c  in CNF:
c    -b^{10, 50}_2 ∨ -b^{10, 50}_1 ∨ -b^{10, 50}_0 ∨ false 
c  in DIMACS:
-11183 -11184 -11185  0

c i = 51
c  -2+1 --> -1
c    ( b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧  p_510) -> ( b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0)
c  in CNF:
c    -b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨  b^{10, 52}_2
c    -b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_1
c    -b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨  b^{10, 52}_0
c  in DIMACS:
-11186 -11187  11188 -510  11189 0
-11186 -11187  11188 -510 -11190 0
-11186 -11187  11188 -510  11191 0

c  -1+1 --> 0
c    ( b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0 ∧  p_510) -> (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧ -b^{10, 52}_0)
c  in CNF:
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_2
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_1
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_0
c  in DIMACS:
-11186  11187 -11188 -510 -11189 0
-11186  11187 -11188 -510 -11190 0
-11186  11187 -11188 -510 -11191 0

c  0+1 --> 1
c    (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧  p_510) -> (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0)
c  in CNF:
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_2
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_1
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨  b^{10, 52}_0
c  in DIMACS:
 11186  11187  11188 -510 -11189 0
 11186  11187  11188 -510 -11190 0
 11186  11187  11188 -510  11191 0

c  1+1 --> 2
c    (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0 ∧  p_510) -> (-b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0)
c  in CNF:
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_2
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨  b^{10, 52}_1
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ -p_510 ∨ -b^{10, 52}_0
c  in DIMACS:
 11186  11187 -11188 -510 -11189 0
 11186  11187 -11188 -510  11190 0
 11186  11187 -11188 -510 -11191 0

c  2+1 --> break 
c    (-b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧  p_510) -> break
c  in CNF:
c     b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 11186 -11187  11188 -510 1162 0


c  2-1 --> 1
c    (-b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧ -p_510) -> (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0)
c  in CNF:
c     b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_2
c     b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_1
c     b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨  b^{10, 52}_0
c  in DIMACS:
 11186 -11187  11188  510 -11189 0
 11186 -11187  11188  510 -11190 0
 11186 -11187  11188  510  11191 0

c  1-1 --> 0
c    (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0 ∧ -p_510) -> (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧ -b^{10, 52}_0)
c  in CNF:
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_2
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_1
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_0
c  in DIMACS:
 11186  11187 -11188  510 -11189 0
 11186  11187 -11188  510 -11190 0
 11186  11187 -11188  510 -11191 0

c  0-1 --> -1
c    (-b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧ -p_510) -> ( b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0)
c  in CNF:
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨  b^{10, 52}_2
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_1
c     b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨  b^{10, 52}_0
c  in DIMACS:
 11186  11187  11188  510  11189 0
 11186  11187  11188  510 -11190 0
 11186  11187  11188  510  11191 0

c  -1-1 --> -2
c    ( b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧  b^{10, 51}_0 ∧ -p_510) -> ( b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0)
c  in CNF:
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨  b^{10, 52}_2
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨  b^{10, 52}_1
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨  p_510 ∨ -b^{10, 52}_0
c  in DIMACS:
-11186  11187 -11188  510  11189 0
-11186  11187 -11188  510  11190 0
-11186  11187 -11188  510 -11191 0

c  -2-1 --> break 
c    ( b^{10, 51}_2 ∧  b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨  b^{10, 51}_0 ∨  p_510 ∨ break
c  in DIMACS:
-11186 -11187  11188  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 51}_2 ∧ -b^{10, 51}_1 ∧ -b^{10, 51}_0 ∧ true) 
c  in CNF:
c    -b^{10, 51}_2 ∨  b^{10, 51}_1 ∨  b^{10, 51}_0 ∨ false 
c  in DIMACS:
-11186  11187  11188  0

c  3 does not represent an automaton state.
c    -(-b^{10, 51}_2 ∧  b^{10, 51}_1 ∧  b^{10, 51}_0 ∧ true) 
c  in CNF:
c     b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ false 
c  in DIMACS:
 11186 -11187 -11188  0
c  -3 does not represent an automaton state.
c    -( b^{10, 51}_2 ∧  b^{10, 51}_1 ∧  b^{10, 51}_0 ∧ true) 
c  in CNF:
c    -b^{10, 51}_2 ∨ -b^{10, 51}_1 ∨ -b^{10, 51}_0 ∨ false 
c  in DIMACS:
-11186 -11187 -11188  0

c i = 52
c  -2+1 --> -1
c    ( b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧  p_520) -> ( b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0)
c  in CNF:
c    -b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨  b^{10, 53}_2
c    -b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_1
c    -b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨  b^{10, 53}_0
c  in DIMACS:
-11189 -11190  11191 -520  11192 0
-11189 -11190  11191 -520 -11193 0
-11189 -11190  11191 -520  11194 0

c  -1+1 --> 0
c    ( b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0 ∧  p_520) -> (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧ -b^{10, 53}_0)
c  in CNF:
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_2
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_1
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_0
c  in DIMACS:
-11189  11190 -11191 -520 -11192 0
-11189  11190 -11191 -520 -11193 0
-11189  11190 -11191 -520 -11194 0

c  0+1 --> 1
c    (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧  p_520) -> (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0)
c  in CNF:
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_2
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_1
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨  b^{10, 53}_0
c  in DIMACS:
 11189  11190  11191 -520 -11192 0
 11189  11190  11191 -520 -11193 0
 11189  11190  11191 -520  11194 0

c  1+1 --> 2
c    (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0 ∧  p_520) -> (-b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0)
c  in CNF:
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_2
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨  b^{10, 53}_1
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ -p_520 ∨ -b^{10, 53}_0
c  in DIMACS:
 11189  11190 -11191 -520 -11192 0
 11189  11190 -11191 -520  11193 0
 11189  11190 -11191 -520 -11194 0

c  2+1 --> break 
c    (-b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧  p_520) -> break
c  in CNF:
c     b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 11189 -11190  11191 -520 1162 0


c  2-1 --> 1
c    (-b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧ -p_520) -> (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0)
c  in CNF:
c     b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_2
c     b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_1
c     b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨  b^{10, 53}_0
c  in DIMACS:
 11189 -11190  11191  520 -11192 0
 11189 -11190  11191  520 -11193 0
 11189 -11190  11191  520  11194 0

c  1-1 --> 0
c    (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0 ∧ -p_520) -> (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧ -b^{10, 53}_0)
c  in CNF:
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_2
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_1
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_0
c  in DIMACS:
 11189  11190 -11191  520 -11192 0
 11189  11190 -11191  520 -11193 0
 11189  11190 -11191  520 -11194 0

c  0-1 --> -1
c    (-b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧ -p_520) -> ( b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0)
c  in CNF:
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨  b^{10, 53}_2
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_1
c     b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨  b^{10, 53}_0
c  in DIMACS:
 11189  11190  11191  520  11192 0
 11189  11190  11191  520 -11193 0
 11189  11190  11191  520  11194 0

c  -1-1 --> -2
c    ( b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧  b^{10, 52}_0 ∧ -p_520) -> ( b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0)
c  in CNF:
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨  b^{10, 53}_2
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨  b^{10, 53}_1
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨  p_520 ∨ -b^{10, 53}_0
c  in DIMACS:
-11189  11190 -11191  520  11192 0
-11189  11190 -11191  520  11193 0
-11189  11190 -11191  520 -11194 0

c  -2-1 --> break 
c    ( b^{10, 52}_2 ∧  b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨  b^{10, 52}_0 ∨  p_520 ∨ break
c  in DIMACS:
-11189 -11190  11191  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 52}_2 ∧ -b^{10, 52}_1 ∧ -b^{10, 52}_0 ∧ true) 
c  in CNF:
c    -b^{10, 52}_2 ∨  b^{10, 52}_1 ∨  b^{10, 52}_0 ∨ false 
c  in DIMACS:
-11189  11190  11191  0

c  3 does not represent an automaton state.
c    -(-b^{10, 52}_2 ∧  b^{10, 52}_1 ∧  b^{10, 52}_0 ∧ true) 
c  in CNF:
c     b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ false 
c  in DIMACS:
 11189 -11190 -11191  0
c  -3 does not represent an automaton state.
c    -( b^{10, 52}_2 ∧  b^{10, 52}_1 ∧  b^{10, 52}_0 ∧ true) 
c  in CNF:
c    -b^{10, 52}_2 ∨ -b^{10, 52}_1 ∨ -b^{10, 52}_0 ∨ false 
c  in DIMACS:
-11189 -11190 -11191  0

c i = 53
c  -2+1 --> -1
c    ( b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧  p_530) -> ( b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0)
c  in CNF:
c    -b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨  b^{10, 54}_2
c    -b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_1
c    -b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨  b^{10, 54}_0
c  in DIMACS:
-11192 -11193  11194 -530  11195 0
-11192 -11193  11194 -530 -11196 0
-11192 -11193  11194 -530  11197 0

c  -1+1 --> 0
c    ( b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0 ∧  p_530) -> (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧ -b^{10, 54}_0)
c  in CNF:
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_2
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_1
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_0
c  in DIMACS:
-11192  11193 -11194 -530 -11195 0
-11192  11193 -11194 -530 -11196 0
-11192  11193 -11194 -530 -11197 0

c  0+1 --> 1
c    (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧  p_530) -> (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0)
c  in CNF:
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_2
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_1
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨  b^{10, 54}_0
c  in DIMACS:
 11192  11193  11194 -530 -11195 0
 11192  11193  11194 -530 -11196 0
 11192  11193  11194 -530  11197 0

c  1+1 --> 2
c    (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0 ∧  p_530) -> (-b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0)
c  in CNF:
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_2
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨  b^{10, 54}_1
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ -p_530 ∨ -b^{10, 54}_0
c  in DIMACS:
 11192  11193 -11194 -530 -11195 0
 11192  11193 -11194 -530  11196 0
 11192  11193 -11194 -530 -11197 0

c  2+1 --> break 
c    (-b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧  p_530) -> break
c  in CNF:
c     b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 11192 -11193  11194 -530 1162 0


c  2-1 --> 1
c    (-b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧ -p_530) -> (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0)
c  in CNF:
c     b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_2
c     b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_1
c     b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨  b^{10, 54}_0
c  in DIMACS:
 11192 -11193  11194  530 -11195 0
 11192 -11193  11194  530 -11196 0
 11192 -11193  11194  530  11197 0

c  1-1 --> 0
c    (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0 ∧ -p_530) -> (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧ -b^{10, 54}_0)
c  in CNF:
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_2
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_1
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_0
c  in DIMACS:
 11192  11193 -11194  530 -11195 0
 11192  11193 -11194  530 -11196 0
 11192  11193 -11194  530 -11197 0

c  0-1 --> -1
c    (-b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧ -p_530) -> ( b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0)
c  in CNF:
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨  b^{10, 54}_2
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_1
c     b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨  b^{10, 54}_0
c  in DIMACS:
 11192  11193  11194  530  11195 0
 11192  11193  11194  530 -11196 0
 11192  11193  11194  530  11197 0

c  -1-1 --> -2
c    ( b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧  b^{10, 53}_0 ∧ -p_530) -> ( b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0)
c  in CNF:
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨  b^{10, 54}_2
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨  b^{10, 54}_1
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨  p_530 ∨ -b^{10, 54}_0
c  in DIMACS:
-11192  11193 -11194  530  11195 0
-11192  11193 -11194  530  11196 0
-11192  11193 -11194  530 -11197 0

c  -2-1 --> break 
c    ( b^{10, 53}_2 ∧  b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨  b^{10, 53}_0 ∨  p_530 ∨ break
c  in DIMACS:
-11192 -11193  11194  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 53}_2 ∧ -b^{10, 53}_1 ∧ -b^{10, 53}_0 ∧ true) 
c  in CNF:
c    -b^{10, 53}_2 ∨  b^{10, 53}_1 ∨  b^{10, 53}_0 ∨ false 
c  in DIMACS:
-11192  11193  11194  0

c  3 does not represent an automaton state.
c    -(-b^{10, 53}_2 ∧  b^{10, 53}_1 ∧  b^{10, 53}_0 ∧ true) 
c  in CNF:
c     b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ false 
c  in DIMACS:
 11192 -11193 -11194  0
c  -3 does not represent an automaton state.
c    -( b^{10, 53}_2 ∧  b^{10, 53}_1 ∧  b^{10, 53}_0 ∧ true) 
c  in CNF:
c    -b^{10, 53}_2 ∨ -b^{10, 53}_1 ∨ -b^{10, 53}_0 ∨ false 
c  in DIMACS:
-11192 -11193 -11194  0

c i = 54
c  -2+1 --> -1
c    ( b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧  p_540) -> ( b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0)
c  in CNF:
c    -b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨  b^{10, 55}_2
c    -b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_1
c    -b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨  b^{10, 55}_0
c  in DIMACS:
-11195 -11196  11197 -540  11198 0
-11195 -11196  11197 -540 -11199 0
-11195 -11196  11197 -540  11200 0

c  -1+1 --> 0
c    ( b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0 ∧  p_540) -> (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧ -b^{10, 55}_0)
c  in CNF:
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_2
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_1
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_0
c  in DIMACS:
-11195  11196 -11197 -540 -11198 0
-11195  11196 -11197 -540 -11199 0
-11195  11196 -11197 -540 -11200 0

c  0+1 --> 1
c    (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧  p_540) -> (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0)
c  in CNF:
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_2
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_1
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨  b^{10, 55}_0
c  in DIMACS:
 11195  11196  11197 -540 -11198 0
 11195  11196  11197 -540 -11199 0
 11195  11196  11197 -540  11200 0

c  1+1 --> 2
c    (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0 ∧  p_540) -> (-b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0)
c  in CNF:
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_2
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨  b^{10, 55}_1
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ -p_540 ∨ -b^{10, 55}_0
c  in DIMACS:
 11195  11196 -11197 -540 -11198 0
 11195  11196 -11197 -540  11199 0
 11195  11196 -11197 -540 -11200 0

c  2+1 --> break 
c    (-b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧  p_540) -> break
c  in CNF:
c     b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 11195 -11196  11197 -540 1162 0


c  2-1 --> 1
c    (-b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧ -p_540) -> (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0)
c  in CNF:
c     b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_2
c     b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_1
c     b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨  b^{10, 55}_0
c  in DIMACS:
 11195 -11196  11197  540 -11198 0
 11195 -11196  11197  540 -11199 0
 11195 -11196  11197  540  11200 0

c  1-1 --> 0
c    (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0 ∧ -p_540) -> (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧ -b^{10, 55}_0)
c  in CNF:
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_2
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_1
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_0
c  in DIMACS:
 11195  11196 -11197  540 -11198 0
 11195  11196 -11197  540 -11199 0
 11195  11196 -11197  540 -11200 0

c  0-1 --> -1
c    (-b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧ -p_540) -> ( b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0)
c  in CNF:
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨  b^{10, 55}_2
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_1
c     b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨  b^{10, 55}_0
c  in DIMACS:
 11195  11196  11197  540  11198 0
 11195  11196  11197  540 -11199 0
 11195  11196  11197  540  11200 0

c  -1-1 --> -2
c    ( b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧  b^{10, 54}_0 ∧ -p_540) -> ( b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0)
c  in CNF:
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨  b^{10, 55}_2
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨  b^{10, 55}_1
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨  p_540 ∨ -b^{10, 55}_0
c  in DIMACS:
-11195  11196 -11197  540  11198 0
-11195  11196 -11197  540  11199 0
-11195  11196 -11197  540 -11200 0

c  -2-1 --> break 
c    ( b^{10, 54}_2 ∧  b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨  b^{10, 54}_0 ∨  p_540 ∨ break
c  in DIMACS:
-11195 -11196  11197  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 54}_2 ∧ -b^{10, 54}_1 ∧ -b^{10, 54}_0 ∧ true) 
c  in CNF:
c    -b^{10, 54}_2 ∨  b^{10, 54}_1 ∨  b^{10, 54}_0 ∨ false 
c  in DIMACS:
-11195  11196  11197  0

c  3 does not represent an automaton state.
c    -(-b^{10, 54}_2 ∧  b^{10, 54}_1 ∧  b^{10, 54}_0 ∧ true) 
c  in CNF:
c     b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ false 
c  in DIMACS:
 11195 -11196 -11197  0
c  -3 does not represent an automaton state.
c    -( b^{10, 54}_2 ∧  b^{10, 54}_1 ∧  b^{10, 54}_0 ∧ true) 
c  in CNF:
c    -b^{10, 54}_2 ∨ -b^{10, 54}_1 ∨ -b^{10, 54}_0 ∨ false 
c  in DIMACS:
-11195 -11196 -11197  0

c i = 55
c  -2+1 --> -1
c    ( b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧  p_550) -> ( b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0)
c  in CNF:
c    -b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨  b^{10, 56}_2
c    -b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_1
c    -b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨  b^{10, 56}_0
c  in DIMACS:
-11198 -11199  11200 -550  11201 0
-11198 -11199  11200 -550 -11202 0
-11198 -11199  11200 -550  11203 0

c  -1+1 --> 0
c    ( b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0 ∧  p_550) -> (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧ -b^{10, 56}_0)
c  in CNF:
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_2
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_1
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_0
c  in DIMACS:
-11198  11199 -11200 -550 -11201 0
-11198  11199 -11200 -550 -11202 0
-11198  11199 -11200 -550 -11203 0

c  0+1 --> 1
c    (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧  p_550) -> (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0)
c  in CNF:
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_2
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_1
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨  b^{10, 56}_0
c  in DIMACS:
 11198  11199  11200 -550 -11201 0
 11198  11199  11200 -550 -11202 0
 11198  11199  11200 -550  11203 0

c  1+1 --> 2
c    (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0 ∧  p_550) -> (-b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0)
c  in CNF:
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_2
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨  b^{10, 56}_1
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ -p_550 ∨ -b^{10, 56}_0
c  in DIMACS:
 11198  11199 -11200 -550 -11201 0
 11198  11199 -11200 -550  11202 0
 11198  11199 -11200 -550 -11203 0

c  2+1 --> break 
c    (-b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧  p_550) -> break
c  in CNF:
c     b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 11198 -11199  11200 -550 1162 0


c  2-1 --> 1
c    (-b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧ -p_550) -> (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0)
c  in CNF:
c     b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_2
c     b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_1
c     b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨  b^{10, 56}_0
c  in DIMACS:
 11198 -11199  11200  550 -11201 0
 11198 -11199  11200  550 -11202 0
 11198 -11199  11200  550  11203 0

c  1-1 --> 0
c    (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0 ∧ -p_550) -> (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧ -b^{10, 56}_0)
c  in CNF:
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_2
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_1
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_0
c  in DIMACS:
 11198  11199 -11200  550 -11201 0
 11198  11199 -11200  550 -11202 0
 11198  11199 -11200  550 -11203 0

c  0-1 --> -1
c    (-b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧ -p_550) -> ( b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0)
c  in CNF:
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨  b^{10, 56}_2
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_1
c     b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨  b^{10, 56}_0
c  in DIMACS:
 11198  11199  11200  550  11201 0
 11198  11199  11200  550 -11202 0
 11198  11199  11200  550  11203 0

c  -1-1 --> -2
c    ( b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧  b^{10, 55}_0 ∧ -p_550) -> ( b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0)
c  in CNF:
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨  b^{10, 56}_2
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨  b^{10, 56}_1
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨  p_550 ∨ -b^{10, 56}_0
c  in DIMACS:
-11198  11199 -11200  550  11201 0
-11198  11199 -11200  550  11202 0
-11198  11199 -11200  550 -11203 0

c  -2-1 --> break 
c    ( b^{10, 55}_2 ∧  b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨  b^{10, 55}_0 ∨  p_550 ∨ break
c  in DIMACS:
-11198 -11199  11200  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 55}_2 ∧ -b^{10, 55}_1 ∧ -b^{10, 55}_0 ∧ true) 
c  in CNF:
c    -b^{10, 55}_2 ∨  b^{10, 55}_1 ∨  b^{10, 55}_0 ∨ false 
c  in DIMACS:
-11198  11199  11200  0

c  3 does not represent an automaton state.
c    -(-b^{10, 55}_2 ∧  b^{10, 55}_1 ∧  b^{10, 55}_0 ∧ true) 
c  in CNF:
c     b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ false 
c  in DIMACS:
 11198 -11199 -11200  0
c  -3 does not represent an automaton state.
c    -( b^{10, 55}_2 ∧  b^{10, 55}_1 ∧  b^{10, 55}_0 ∧ true) 
c  in CNF:
c    -b^{10, 55}_2 ∨ -b^{10, 55}_1 ∨ -b^{10, 55}_0 ∨ false 
c  in DIMACS:
-11198 -11199 -11200  0

c i = 56
c  -2+1 --> -1
c    ( b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧  p_560) -> ( b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0)
c  in CNF:
c    -b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨  b^{10, 57}_2
c    -b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_1
c    -b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨  b^{10, 57}_0
c  in DIMACS:
-11201 -11202  11203 -560  11204 0
-11201 -11202  11203 -560 -11205 0
-11201 -11202  11203 -560  11206 0

c  -1+1 --> 0
c    ( b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0 ∧  p_560) -> (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧ -b^{10, 57}_0)
c  in CNF:
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_2
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_1
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_0
c  in DIMACS:
-11201  11202 -11203 -560 -11204 0
-11201  11202 -11203 -560 -11205 0
-11201  11202 -11203 -560 -11206 0

c  0+1 --> 1
c    (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧  p_560) -> (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0)
c  in CNF:
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_2
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_1
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨  b^{10, 57}_0
c  in DIMACS:
 11201  11202  11203 -560 -11204 0
 11201  11202  11203 -560 -11205 0
 11201  11202  11203 -560  11206 0

c  1+1 --> 2
c    (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0 ∧  p_560) -> (-b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0)
c  in CNF:
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_2
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨  b^{10, 57}_1
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ -p_560 ∨ -b^{10, 57}_0
c  in DIMACS:
 11201  11202 -11203 -560 -11204 0
 11201  11202 -11203 -560  11205 0
 11201  11202 -11203 -560 -11206 0

c  2+1 --> break 
c    (-b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧  p_560) -> break
c  in CNF:
c     b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 11201 -11202  11203 -560 1162 0


c  2-1 --> 1
c    (-b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧ -p_560) -> (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0)
c  in CNF:
c     b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_2
c     b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_1
c     b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨  b^{10, 57}_0
c  in DIMACS:
 11201 -11202  11203  560 -11204 0
 11201 -11202  11203  560 -11205 0
 11201 -11202  11203  560  11206 0

c  1-1 --> 0
c    (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0 ∧ -p_560) -> (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧ -b^{10, 57}_0)
c  in CNF:
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_2
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_1
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_0
c  in DIMACS:
 11201  11202 -11203  560 -11204 0
 11201  11202 -11203  560 -11205 0
 11201  11202 -11203  560 -11206 0

c  0-1 --> -1
c    (-b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧ -p_560) -> ( b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0)
c  in CNF:
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨  b^{10, 57}_2
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_1
c     b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨  b^{10, 57}_0
c  in DIMACS:
 11201  11202  11203  560  11204 0
 11201  11202  11203  560 -11205 0
 11201  11202  11203  560  11206 0

c  -1-1 --> -2
c    ( b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧  b^{10, 56}_0 ∧ -p_560) -> ( b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0)
c  in CNF:
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨  b^{10, 57}_2
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨  b^{10, 57}_1
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨  p_560 ∨ -b^{10, 57}_0
c  in DIMACS:
-11201  11202 -11203  560  11204 0
-11201  11202 -11203  560  11205 0
-11201  11202 -11203  560 -11206 0

c  -2-1 --> break 
c    ( b^{10, 56}_2 ∧  b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨  b^{10, 56}_0 ∨  p_560 ∨ break
c  in DIMACS:
-11201 -11202  11203  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 56}_2 ∧ -b^{10, 56}_1 ∧ -b^{10, 56}_0 ∧ true) 
c  in CNF:
c    -b^{10, 56}_2 ∨  b^{10, 56}_1 ∨  b^{10, 56}_0 ∨ false 
c  in DIMACS:
-11201  11202  11203  0

c  3 does not represent an automaton state.
c    -(-b^{10, 56}_2 ∧  b^{10, 56}_1 ∧  b^{10, 56}_0 ∧ true) 
c  in CNF:
c     b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ false 
c  in DIMACS:
 11201 -11202 -11203  0
c  -3 does not represent an automaton state.
c    -( b^{10, 56}_2 ∧  b^{10, 56}_1 ∧  b^{10, 56}_0 ∧ true) 
c  in CNF:
c    -b^{10, 56}_2 ∨ -b^{10, 56}_1 ∨ -b^{10, 56}_0 ∨ false 
c  in DIMACS:
-11201 -11202 -11203  0

c i = 57
c  -2+1 --> -1
c    ( b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧  p_570) -> ( b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0)
c  in CNF:
c    -b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨  b^{10, 58}_2
c    -b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_1
c    -b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨  b^{10, 58}_0
c  in DIMACS:
-11204 -11205  11206 -570  11207 0
-11204 -11205  11206 -570 -11208 0
-11204 -11205  11206 -570  11209 0

c  -1+1 --> 0
c    ( b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0 ∧  p_570) -> (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧ -b^{10, 58}_0)
c  in CNF:
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_2
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_1
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_0
c  in DIMACS:
-11204  11205 -11206 -570 -11207 0
-11204  11205 -11206 -570 -11208 0
-11204  11205 -11206 -570 -11209 0

c  0+1 --> 1
c    (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧  p_570) -> (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0)
c  in CNF:
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_2
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_1
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨  b^{10, 58}_0
c  in DIMACS:
 11204  11205  11206 -570 -11207 0
 11204  11205  11206 -570 -11208 0
 11204  11205  11206 -570  11209 0

c  1+1 --> 2
c    (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0 ∧  p_570) -> (-b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0)
c  in CNF:
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_2
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨  b^{10, 58}_1
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ -p_570 ∨ -b^{10, 58}_0
c  in DIMACS:
 11204  11205 -11206 -570 -11207 0
 11204  11205 -11206 -570  11208 0
 11204  11205 -11206 -570 -11209 0

c  2+1 --> break 
c    (-b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧  p_570) -> break
c  in CNF:
c     b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 11204 -11205  11206 -570 1162 0


c  2-1 --> 1
c    (-b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧ -p_570) -> (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0)
c  in CNF:
c     b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_2
c     b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_1
c     b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨  b^{10, 58}_0
c  in DIMACS:
 11204 -11205  11206  570 -11207 0
 11204 -11205  11206  570 -11208 0
 11204 -11205  11206  570  11209 0

c  1-1 --> 0
c    (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0 ∧ -p_570) -> (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧ -b^{10, 58}_0)
c  in CNF:
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_2
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_1
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_0
c  in DIMACS:
 11204  11205 -11206  570 -11207 0
 11204  11205 -11206  570 -11208 0
 11204  11205 -11206  570 -11209 0

c  0-1 --> -1
c    (-b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧ -p_570) -> ( b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0)
c  in CNF:
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨  b^{10, 58}_2
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_1
c     b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨  b^{10, 58}_0
c  in DIMACS:
 11204  11205  11206  570  11207 0
 11204  11205  11206  570 -11208 0
 11204  11205  11206  570  11209 0

c  -1-1 --> -2
c    ( b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧  b^{10, 57}_0 ∧ -p_570) -> ( b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0)
c  in CNF:
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨  b^{10, 58}_2
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨  b^{10, 58}_1
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨  p_570 ∨ -b^{10, 58}_0
c  in DIMACS:
-11204  11205 -11206  570  11207 0
-11204  11205 -11206  570  11208 0
-11204  11205 -11206  570 -11209 0

c  -2-1 --> break 
c    ( b^{10, 57}_2 ∧  b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨  b^{10, 57}_0 ∨  p_570 ∨ break
c  in DIMACS:
-11204 -11205  11206  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 57}_2 ∧ -b^{10, 57}_1 ∧ -b^{10, 57}_0 ∧ true) 
c  in CNF:
c    -b^{10, 57}_2 ∨  b^{10, 57}_1 ∨  b^{10, 57}_0 ∨ false 
c  in DIMACS:
-11204  11205  11206  0

c  3 does not represent an automaton state.
c    -(-b^{10, 57}_2 ∧  b^{10, 57}_1 ∧  b^{10, 57}_0 ∧ true) 
c  in CNF:
c     b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ false 
c  in DIMACS:
 11204 -11205 -11206  0
c  -3 does not represent an automaton state.
c    -( b^{10, 57}_2 ∧  b^{10, 57}_1 ∧  b^{10, 57}_0 ∧ true) 
c  in CNF:
c    -b^{10, 57}_2 ∨ -b^{10, 57}_1 ∨ -b^{10, 57}_0 ∨ false 
c  in DIMACS:
-11204 -11205 -11206  0

c i = 58
c  -2+1 --> -1
c    ( b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧  p_580) -> ( b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0)
c  in CNF:
c    -b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨  b^{10, 59}_2
c    -b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_1
c    -b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨  b^{10, 59}_0
c  in DIMACS:
-11207 -11208  11209 -580  11210 0
-11207 -11208  11209 -580 -11211 0
-11207 -11208  11209 -580  11212 0

c  -1+1 --> 0
c    ( b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0 ∧  p_580) -> (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧ -b^{10, 59}_0)
c  in CNF:
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_2
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_1
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_0
c  in DIMACS:
-11207  11208 -11209 -580 -11210 0
-11207  11208 -11209 -580 -11211 0
-11207  11208 -11209 -580 -11212 0

c  0+1 --> 1
c    (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧  p_580) -> (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0)
c  in CNF:
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_2
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_1
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨  b^{10, 59}_0
c  in DIMACS:
 11207  11208  11209 -580 -11210 0
 11207  11208  11209 -580 -11211 0
 11207  11208  11209 -580  11212 0

c  1+1 --> 2
c    (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0 ∧  p_580) -> (-b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0)
c  in CNF:
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_2
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨  b^{10, 59}_1
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ -p_580 ∨ -b^{10, 59}_0
c  in DIMACS:
 11207  11208 -11209 -580 -11210 0
 11207  11208 -11209 -580  11211 0
 11207  11208 -11209 -580 -11212 0

c  2+1 --> break 
c    (-b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧  p_580) -> break
c  in CNF:
c     b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 11207 -11208  11209 -580 1162 0


c  2-1 --> 1
c    (-b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧ -p_580) -> (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0)
c  in CNF:
c     b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_2
c     b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_1
c     b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨  b^{10, 59}_0
c  in DIMACS:
 11207 -11208  11209  580 -11210 0
 11207 -11208  11209  580 -11211 0
 11207 -11208  11209  580  11212 0

c  1-1 --> 0
c    (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0 ∧ -p_580) -> (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧ -b^{10, 59}_0)
c  in CNF:
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_2
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_1
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_0
c  in DIMACS:
 11207  11208 -11209  580 -11210 0
 11207  11208 -11209  580 -11211 0
 11207  11208 -11209  580 -11212 0

c  0-1 --> -1
c    (-b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧ -p_580) -> ( b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0)
c  in CNF:
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨  b^{10, 59}_2
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_1
c     b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨  b^{10, 59}_0
c  in DIMACS:
 11207  11208  11209  580  11210 0
 11207  11208  11209  580 -11211 0
 11207  11208  11209  580  11212 0

c  -1-1 --> -2
c    ( b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧  b^{10, 58}_0 ∧ -p_580) -> ( b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0)
c  in CNF:
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨  b^{10, 59}_2
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨  b^{10, 59}_1
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨  p_580 ∨ -b^{10, 59}_0
c  in DIMACS:
-11207  11208 -11209  580  11210 0
-11207  11208 -11209  580  11211 0
-11207  11208 -11209  580 -11212 0

c  -2-1 --> break 
c    ( b^{10, 58}_2 ∧  b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨  b^{10, 58}_0 ∨  p_580 ∨ break
c  in DIMACS:
-11207 -11208  11209  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 58}_2 ∧ -b^{10, 58}_1 ∧ -b^{10, 58}_0 ∧ true) 
c  in CNF:
c    -b^{10, 58}_2 ∨  b^{10, 58}_1 ∨  b^{10, 58}_0 ∨ false 
c  in DIMACS:
-11207  11208  11209  0

c  3 does not represent an automaton state.
c    -(-b^{10, 58}_2 ∧  b^{10, 58}_1 ∧  b^{10, 58}_0 ∧ true) 
c  in CNF:
c     b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ false 
c  in DIMACS:
 11207 -11208 -11209  0
c  -3 does not represent an automaton state.
c    -( b^{10, 58}_2 ∧  b^{10, 58}_1 ∧  b^{10, 58}_0 ∧ true) 
c  in CNF:
c    -b^{10, 58}_2 ∨ -b^{10, 58}_1 ∨ -b^{10, 58}_0 ∨ false 
c  in DIMACS:
-11207 -11208 -11209  0

c i = 59
c  -2+1 --> -1
c    ( b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧  p_590) -> ( b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0)
c  in CNF:
c    -b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨  b^{10, 60}_2
c    -b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_1
c    -b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨  b^{10, 60}_0
c  in DIMACS:
-11210 -11211  11212 -590  11213 0
-11210 -11211  11212 -590 -11214 0
-11210 -11211  11212 -590  11215 0

c  -1+1 --> 0
c    ( b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0 ∧  p_590) -> (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧ -b^{10, 60}_0)
c  in CNF:
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_2
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_1
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_0
c  in DIMACS:
-11210  11211 -11212 -590 -11213 0
-11210  11211 -11212 -590 -11214 0
-11210  11211 -11212 -590 -11215 0

c  0+1 --> 1
c    (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧  p_590) -> (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0)
c  in CNF:
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_2
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_1
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨  b^{10, 60}_0
c  in DIMACS:
 11210  11211  11212 -590 -11213 0
 11210  11211  11212 -590 -11214 0
 11210  11211  11212 -590  11215 0

c  1+1 --> 2
c    (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0 ∧  p_590) -> (-b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0)
c  in CNF:
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_2
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨  b^{10, 60}_1
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ -p_590 ∨ -b^{10, 60}_0
c  in DIMACS:
 11210  11211 -11212 -590 -11213 0
 11210  11211 -11212 -590  11214 0
 11210  11211 -11212 -590 -11215 0

c  2+1 --> break 
c    (-b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧  p_590) -> break
c  in CNF:
c     b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 11210 -11211  11212 -590 1162 0


c  2-1 --> 1
c    (-b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧ -p_590) -> (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0)
c  in CNF:
c     b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_2
c     b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_1
c     b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨  b^{10, 60}_0
c  in DIMACS:
 11210 -11211  11212  590 -11213 0
 11210 -11211  11212  590 -11214 0
 11210 -11211  11212  590  11215 0

c  1-1 --> 0
c    (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0 ∧ -p_590) -> (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧ -b^{10, 60}_0)
c  in CNF:
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_2
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_1
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_0
c  in DIMACS:
 11210  11211 -11212  590 -11213 0
 11210  11211 -11212  590 -11214 0
 11210  11211 -11212  590 -11215 0

c  0-1 --> -1
c    (-b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧ -p_590) -> ( b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0)
c  in CNF:
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨  b^{10, 60}_2
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_1
c     b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨  b^{10, 60}_0
c  in DIMACS:
 11210  11211  11212  590  11213 0
 11210  11211  11212  590 -11214 0
 11210  11211  11212  590  11215 0

c  -1-1 --> -2
c    ( b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧  b^{10, 59}_0 ∧ -p_590) -> ( b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0)
c  in CNF:
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨  b^{10, 60}_2
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨  b^{10, 60}_1
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨  p_590 ∨ -b^{10, 60}_0
c  in DIMACS:
-11210  11211 -11212  590  11213 0
-11210  11211 -11212  590  11214 0
-11210  11211 -11212  590 -11215 0

c  -2-1 --> break 
c    ( b^{10, 59}_2 ∧  b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨  b^{10, 59}_0 ∨  p_590 ∨ break
c  in DIMACS:
-11210 -11211  11212  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 59}_2 ∧ -b^{10, 59}_1 ∧ -b^{10, 59}_0 ∧ true) 
c  in CNF:
c    -b^{10, 59}_2 ∨  b^{10, 59}_1 ∨  b^{10, 59}_0 ∨ false 
c  in DIMACS:
-11210  11211  11212  0

c  3 does not represent an automaton state.
c    -(-b^{10, 59}_2 ∧  b^{10, 59}_1 ∧  b^{10, 59}_0 ∧ true) 
c  in CNF:
c     b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ false 
c  in DIMACS:
 11210 -11211 -11212  0
c  -3 does not represent an automaton state.
c    -( b^{10, 59}_2 ∧  b^{10, 59}_1 ∧  b^{10, 59}_0 ∧ true) 
c  in CNF:
c    -b^{10, 59}_2 ∨ -b^{10, 59}_1 ∨ -b^{10, 59}_0 ∨ false 
c  in DIMACS:
-11210 -11211 -11212  0

c i = 60
c  -2+1 --> -1
c    ( b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧  p_600) -> ( b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0)
c  in CNF:
c    -b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨  b^{10, 61}_2
c    -b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_1
c    -b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨  b^{10, 61}_0
c  in DIMACS:
-11213 -11214  11215 -600  11216 0
-11213 -11214  11215 -600 -11217 0
-11213 -11214  11215 -600  11218 0

c  -1+1 --> 0
c    ( b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0 ∧  p_600) -> (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧ -b^{10, 61}_0)
c  in CNF:
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_2
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_1
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_0
c  in DIMACS:
-11213  11214 -11215 -600 -11216 0
-11213  11214 -11215 -600 -11217 0
-11213  11214 -11215 -600 -11218 0

c  0+1 --> 1
c    (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧  p_600) -> (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0)
c  in CNF:
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_2
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_1
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨  b^{10, 61}_0
c  in DIMACS:
 11213  11214  11215 -600 -11216 0
 11213  11214  11215 -600 -11217 0
 11213  11214  11215 -600  11218 0

c  1+1 --> 2
c    (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0 ∧  p_600) -> (-b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0)
c  in CNF:
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_2
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨  b^{10, 61}_1
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ -p_600 ∨ -b^{10, 61}_0
c  in DIMACS:
 11213  11214 -11215 -600 -11216 0
 11213  11214 -11215 -600  11217 0
 11213  11214 -11215 -600 -11218 0

c  2+1 --> break 
c    (-b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧  p_600) -> break
c  in CNF:
c     b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 11213 -11214  11215 -600 1162 0


c  2-1 --> 1
c    (-b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧ -p_600) -> (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0)
c  in CNF:
c     b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_2
c     b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_1
c     b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨  b^{10, 61}_0
c  in DIMACS:
 11213 -11214  11215  600 -11216 0
 11213 -11214  11215  600 -11217 0
 11213 -11214  11215  600  11218 0

c  1-1 --> 0
c    (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0 ∧ -p_600) -> (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧ -b^{10, 61}_0)
c  in CNF:
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_2
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_1
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_0
c  in DIMACS:
 11213  11214 -11215  600 -11216 0
 11213  11214 -11215  600 -11217 0
 11213  11214 -11215  600 -11218 0

c  0-1 --> -1
c    (-b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧ -p_600) -> ( b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0)
c  in CNF:
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨  b^{10, 61}_2
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_1
c     b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨  b^{10, 61}_0
c  in DIMACS:
 11213  11214  11215  600  11216 0
 11213  11214  11215  600 -11217 0
 11213  11214  11215  600  11218 0

c  -1-1 --> -2
c    ( b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧  b^{10, 60}_0 ∧ -p_600) -> ( b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0)
c  in CNF:
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨  b^{10, 61}_2
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨  b^{10, 61}_1
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨  p_600 ∨ -b^{10, 61}_0
c  in DIMACS:
-11213  11214 -11215  600  11216 0
-11213  11214 -11215  600  11217 0
-11213  11214 -11215  600 -11218 0

c  -2-1 --> break 
c    ( b^{10, 60}_2 ∧  b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨  b^{10, 60}_0 ∨  p_600 ∨ break
c  in DIMACS:
-11213 -11214  11215  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 60}_2 ∧ -b^{10, 60}_1 ∧ -b^{10, 60}_0 ∧ true) 
c  in CNF:
c    -b^{10, 60}_2 ∨  b^{10, 60}_1 ∨  b^{10, 60}_0 ∨ false 
c  in DIMACS:
-11213  11214  11215  0

c  3 does not represent an automaton state.
c    -(-b^{10, 60}_2 ∧  b^{10, 60}_1 ∧  b^{10, 60}_0 ∧ true) 
c  in CNF:
c     b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ false 
c  in DIMACS:
 11213 -11214 -11215  0
c  -3 does not represent an automaton state.
c    -( b^{10, 60}_2 ∧  b^{10, 60}_1 ∧  b^{10, 60}_0 ∧ true) 
c  in CNF:
c    -b^{10, 60}_2 ∨ -b^{10, 60}_1 ∨ -b^{10, 60}_0 ∨ false 
c  in DIMACS:
-11213 -11214 -11215  0

c i = 61
c  -2+1 --> -1
c    ( b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧  p_610) -> ( b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0)
c  in CNF:
c    -b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨  b^{10, 62}_2
c    -b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_1
c    -b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨  b^{10, 62}_0
c  in DIMACS:
-11216 -11217  11218 -610  11219 0
-11216 -11217  11218 -610 -11220 0
-11216 -11217  11218 -610  11221 0

c  -1+1 --> 0
c    ( b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0 ∧  p_610) -> (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧ -b^{10, 62}_0)
c  in CNF:
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_2
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_1
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_0
c  in DIMACS:
-11216  11217 -11218 -610 -11219 0
-11216  11217 -11218 -610 -11220 0
-11216  11217 -11218 -610 -11221 0

c  0+1 --> 1
c    (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧  p_610) -> (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0)
c  in CNF:
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_2
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_1
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨  b^{10, 62}_0
c  in DIMACS:
 11216  11217  11218 -610 -11219 0
 11216  11217  11218 -610 -11220 0
 11216  11217  11218 -610  11221 0

c  1+1 --> 2
c    (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0 ∧  p_610) -> (-b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0)
c  in CNF:
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_2
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨  b^{10, 62}_1
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ -p_610 ∨ -b^{10, 62}_0
c  in DIMACS:
 11216  11217 -11218 -610 -11219 0
 11216  11217 -11218 -610  11220 0
 11216  11217 -11218 -610 -11221 0

c  2+1 --> break 
c    (-b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧  p_610) -> break
c  in CNF:
c     b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 11216 -11217  11218 -610 1162 0


c  2-1 --> 1
c    (-b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧ -p_610) -> (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0)
c  in CNF:
c     b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_2
c     b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_1
c     b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨  b^{10, 62}_0
c  in DIMACS:
 11216 -11217  11218  610 -11219 0
 11216 -11217  11218  610 -11220 0
 11216 -11217  11218  610  11221 0

c  1-1 --> 0
c    (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0 ∧ -p_610) -> (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧ -b^{10, 62}_0)
c  in CNF:
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_2
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_1
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_0
c  in DIMACS:
 11216  11217 -11218  610 -11219 0
 11216  11217 -11218  610 -11220 0
 11216  11217 -11218  610 -11221 0

c  0-1 --> -1
c    (-b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧ -p_610) -> ( b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0)
c  in CNF:
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨  b^{10, 62}_2
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_1
c     b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨  b^{10, 62}_0
c  in DIMACS:
 11216  11217  11218  610  11219 0
 11216  11217  11218  610 -11220 0
 11216  11217  11218  610  11221 0

c  -1-1 --> -2
c    ( b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧  b^{10, 61}_0 ∧ -p_610) -> ( b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0)
c  in CNF:
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨  b^{10, 62}_2
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨  b^{10, 62}_1
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨  p_610 ∨ -b^{10, 62}_0
c  in DIMACS:
-11216  11217 -11218  610  11219 0
-11216  11217 -11218  610  11220 0
-11216  11217 -11218  610 -11221 0

c  -2-1 --> break 
c    ( b^{10, 61}_2 ∧  b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨  b^{10, 61}_0 ∨  p_610 ∨ break
c  in DIMACS:
-11216 -11217  11218  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 61}_2 ∧ -b^{10, 61}_1 ∧ -b^{10, 61}_0 ∧ true) 
c  in CNF:
c    -b^{10, 61}_2 ∨  b^{10, 61}_1 ∨  b^{10, 61}_0 ∨ false 
c  in DIMACS:
-11216  11217  11218  0

c  3 does not represent an automaton state.
c    -(-b^{10, 61}_2 ∧  b^{10, 61}_1 ∧  b^{10, 61}_0 ∧ true) 
c  in CNF:
c     b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ false 
c  in DIMACS:
 11216 -11217 -11218  0
c  -3 does not represent an automaton state.
c    -( b^{10, 61}_2 ∧  b^{10, 61}_1 ∧  b^{10, 61}_0 ∧ true) 
c  in CNF:
c    -b^{10, 61}_2 ∨ -b^{10, 61}_1 ∨ -b^{10, 61}_0 ∨ false 
c  in DIMACS:
-11216 -11217 -11218  0

c i = 62
c  -2+1 --> -1
c    ( b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧  p_620) -> ( b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0)
c  in CNF:
c    -b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨  b^{10, 63}_2
c    -b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_1
c    -b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨  b^{10, 63}_0
c  in DIMACS:
-11219 -11220  11221 -620  11222 0
-11219 -11220  11221 -620 -11223 0
-11219 -11220  11221 -620  11224 0

c  -1+1 --> 0
c    ( b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0 ∧  p_620) -> (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧ -b^{10, 63}_0)
c  in CNF:
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_2
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_1
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_0
c  in DIMACS:
-11219  11220 -11221 -620 -11222 0
-11219  11220 -11221 -620 -11223 0
-11219  11220 -11221 -620 -11224 0

c  0+1 --> 1
c    (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧  p_620) -> (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0)
c  in CNF:
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_2
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_1
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨  b^{10, 63}_0
c  in DIMACS:
 11219  11220  11221 -620 -11222 0
 11219  11220  11221 -620 -11223 0
 11219  11220  11221 -620  11224 0

c  1+1 --> 2
c    (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0 ∧  p_620) -> (-b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0)
c  in CNF:
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_2
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨  b^{10, 63}_1
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ -p_620 ∨ -b^{10, 63}_0
c  in DIMACS:
 11219  11220 -11221 -620 -11222 0
 11219  11220 -11221 -620  11223 0
 11219  11220 -11221 -620 -11224 0

c  2+1 --> break 
c    (-b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧  p_620) -> break
c  in CNF:
c     b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 11219 -11220  11221 -620 1162 0


c  2-1 --> 1
c    (-b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧ -p_620) -> (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0)
c  in CNF:
c     b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_2
c     b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_1
c     b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨  b^{10, 63}_0
c  in DIMACS:
 11219 -11220  11221  620 -11222 0
 11219 -11220  11221  620 -11223 0
 11219 -11220  11221  620  11224 0

c  1-1 --> 0
c    (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0 ∧ -p_620) -> (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧ -b^{10, 63}_0)
c  in CNF:
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_2
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_1
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_0
c  in DIMACS:
 11219  11220 -11221  620 -11222 0
 11219  11220 -11221  620 -11223 0
 11219  11220 -11221  620 -11224 0

c  0-1 --> -1
c    (-b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧ -p_620) -> ( b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0)
c  in CNF:
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨  b^{10, 63}_2
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_1
c     b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨  b^{10, 63}_0
c  in DIMACS:
 11219  11220  11221  620  11222 0
 11219  11220  11221  620 -11223 0
 11219  11220  11221  620  11224 0

c  -1-1 --> -2
c    ( b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧  b^{10, 62}_0 ∧ -p_620) -> ( b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0)
c  in CNF:
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨  b^{10, 63}_2
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨  b^{10, 63}_1
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨  p_620 ∨ -b^{10, 63}_0
c  in DIMACS:
-11219  11220 -11221  620  11222 0
-11219  11220 -11221  620  11223 0
-11219  11220 -11221  620 -11224 0

c  -2-1 --> break 
c    ( b^{10, 62}_2 ∧  b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨  b^{10, 62}_0 ∨  p_620 ∨ break
c  in DIMACS:
-11219 -11220  11221  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 62}_2 ∧ -b^{10, 62}_1 ∧ -b^{10, 62}_0 ∧ true) 
c  in CNF:
c    -b^{10, 62}_2 ∨  b^{10, 62}_1 ∨  b^{10, 62}_0 ∨ false 
c  in DIMACS:
-11219  11220  11221  0

c  3 does not represent an automaton state.
c    -(-b^{10, 62}_2 ∧  b^{10, 62}_1 ∧  b^{10, 62}_0 ∧ true) 
c  in CNF:
c     b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ false 
c  in DIMACS:
 11219 -11220 -11221  0
c  -3 does not represent an automaton state.
c    -( b^{10, 62}_2 ∧  b^{10, 62}_1 ∧  b^{10, 62}_0 ∧ true) 
c  in CNF:
c    -b^{10, 62}_2 ∨ -b^{10, 62}_1 ∨ -b^{10, 62}_0 ∨ false 
c  in DIMACS:
-11219 -11220 -11221  0

c i = 63
c  -2+1 --> -1
c    ( b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧  p_630) -> ( b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0)
c  in CNF:
c    -b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨  b^{10, 64}_2
c    -b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_1
c    -b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨  b^{10, 64}_0
c  in DIMACS:
-11222 -11223  11224 -630  11225 0
-11222 -11223  11224 -630 -11226 0
-11222 -11223  11224 -630  11227 0

c  -1+1 --> 0
c    ( b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0 ∧  p_630) -> (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧ -b^{10, 64}_0)
c  in CNF:
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_2
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_1
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_0
c  in DIMACS:
-11222  11223 -11224 -630 -11225 0
-11222  11223 -11224 -630 -11226 0
-11222  11223 -11224 -630 -11227 0

c  0+1 --> 1
c    (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧  p_630) -> (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0)
c  in CNF:
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_2
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_1
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨  b^{10, 64}_0
c  in DIMACS:
 11222  11223  11224 -630 -11225 0
 11222  11223  11224 -630 -11226 0
 11222  11223  11224 -630  11227 0

c  1+1 --> 2
c    (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0 ∧  p_630) -> (-b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0)
c  in CNF:
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_2
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨  b^{10, 64}_1
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ -p_630 ∨ -b^{10, 64}_0
c  in DIMACS:
 11222  11223 -11224 -630 -11225 0
 11222  11223 -11224 -630  11226 0
 11222  11223 -11224 -630 -11227 0

c  2+1 --> break 
c    (-b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧  p_630) -> break
c  in CNF:
c     b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 11222 -11223  11224 -630 1162 0


c  2-1 --> 1
c    (-b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧ -p_630) -> (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0)
c  in CNF:
c     b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_2
c     b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_1
c     b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨  b^{10, 64}_0
c  in DIMACS:
 11222 -11223  11224  630 -11225 0
 11222 -11223  11224  630 -11226 0
 11222 -11223  11224  630  11227 0

c  1-1 --> 0
c    (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0 ∧ -p_630) -> (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧ -b^{10, 64}_0)
c  in CNF:
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_2
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_1
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_0
c  in DIMACS:
 11222  11223 -11224  630 -11225 0
 11222  11223 -11224  630 -11226 0
 11222  11223 -11224  630 -11227 0

c  0-1 --> -1
c    (-b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧ -p_630) -> ( b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0)
c  in CNF:
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨  b^{10, 64}_2
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_1
c     b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨  b^{10, 64}_0
c  in DIMACS:
 11222  11223  11224  630  11225 0
 11222  11223  11224  630 -11226 0
 11222  11223  11224  630  11227 0

c  -1-1 --> -2
c    ( b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧  b^{10, 63}_0 ∧ -p_630) -> ( b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0)
c  in CNF:
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨  b^{10, 64}_2
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨  b^{10, 64}_1
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨  p_630 ∨ -b^{10, 64}_0
c  in DIMACS:
-11222  11223 -11224  630  11225 0
-11222  11223 -11224  630  11226 0
-11222  11223 -11224  630 -11227 0

c  -2-1 --> break 
c    ( b^{10, 63}_2 ∧  b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨  b^{10, 63}_0 ∨  p_630 ∨ break
c  in DIMACS:
-11222 -11223  11224  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 63}_2 ∧ -b^{10, 63}_1 ∧ -b^{10, 63}_0 ∧ true) 
c  in CNF:
c    -b^{10, 63}_2 ∨  b^{10, 63}_1 ∨  b^{10, 63}_0 ∨ false 
c  in DIMACS:
-11222  11223  11224  0

c  3 does not represent an automaton state.
c    -(-b^{10, 63}_2 ∧  b^{10, 63}_1 ∧  b^{10, 63}_0 ∧ true) 
c  in CNF:
c     b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ false 
c  in DIMACS:
 11222 -11223 -11224  0
c  -3 does not represent an automaton state.
c    -( b^{10, 63}_2 ∧  b^{10, 63}_1 ∧  b^{10, 63}_0 ∧ true) 
c  in CNF:
c    -b^{10, 63}_2 ∨ -b^{10, 63}_1 ∨ -b^{10, 63}_0 ∨ false 
c  in DIMACS:
-11222 -11223 -11224  0

c i = 64
c  -2+1 --> -1
c    ( b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧  p_640) -> ( b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0)
c  in CNF:
c    -b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨  b^{10, 65}_2
c    -b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_1
c    -b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨  b^{10, 65}_0
c  in DIMACS:
-11225 -11226  11227 -640  11228 0
-11225 -11226  11227 -640 -11229 0
-11225 -11226  11227 -640  11230 0

c  -1+1 --> 0
c    ( b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0 ∧  p_640) -> (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧ -b^{10, 65}_0)
c  in CNF:
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_2
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_1
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_0
c  in DIMACS:
-11225  11226 -11227 -640 -11228 0
-11225  11226 -11227 -640 -11229 0
-11225  11226 -11227 -640 -11230 0

c  0+1 --> 1
c    (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧  p_640) -> (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0)
c  in CNF:
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_2
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_1
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨  b^{10, 65}_0
c  in DIMACS:
 11225  11226  11227 -640 -11228 0
 11225  11226  11227 -640 -11229 0
 11225  11226  11227 -640  11230 0

c  1+1 --> 2
c    (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0 ∧  p_640) -> (-b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0)
c  in CNF:
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_2
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨  b^{10, 65}_1
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ -p_640 ∨ -b^{10, 65}_0
c  in DIMACS:
 11225  11226 -11227 -640 -11228 0
 11225  11226 -11227 -640  11229 0
 11225  11226 -11227 -640 -11230 0

c  2+1 --> break 
c    (-b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧  p_640) -> break
c  in CNF:
c     b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 11225 -11226  11227 -640 1162 0


c  2-1 --> 1
c    (-b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧ -p_640) -> (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0)
c  in CNF:
c     b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_2
c     b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_1
c     b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨  b^{10, 65}_0
c  in DIMACS:
 11225 -11226  11227  640 -11228 0
 11225 -11226  11227  640 -11229 0
 11225 -11226  11227  640  11230 0

c  1-1 --> 0
c    (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0 ∧ -p_640) -> (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧ -b^{10, 65}_0)
c  in CNF:
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_2
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_1
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_0
c  in DIMACS:
 11225  11226 -11227  640 -11228 0
 11225  11226 -11227  640 -11229 0
 11225  11226 -11227  640 -11230 0

c  0-1 --> -1
c    (-b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧ -p_640) -> ( b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0)
c  in CNF:
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨  b^{10, 65}_2
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_1
c     b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨  b^{10, 65}_0
c  in DIMACS:
 11225  11226  11227  640  11228 0
 11225  11226  11227  640 -11229 0
 11225  11226  11227  640  11230 0

c  -1-1 --> -2
c    ( b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧  b^{10, 64}_0 ∧ -p_640) -> ( b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0)
c  in CNF:
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨  b^{10, 65}_2
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨  b^{10, 65}_1
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨  p_640 ∨ -b^{10, 65}_0
c  in DIMACS:
-11225  11226 -11227  640  11228 0
-11225  11226 -11227  640  11229 0
-11225  11226 -11227  640 -11230 0

c  -2-1 --> break 
c    ( b^{10, 64}_2 ∧  b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨  b^{10, 64}_0 ∨  p_640 ∨ break
c  in DIMACS:
-11225 -11226  11227  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 64}_2 ∧ -b^{10, 64}_1 ∧ -b^{10, 64}_0 ∧ true) 
c  in CNF:
c    -b^{10, 64}_2 ∨  b^{10, 64}_1 ∨  b^{10, 64}_0 ∨ false 
c  in DIMACS:
-11225  11226  11227  0

c  3 does not represent an automaton state.
c    -(-b^{10, 64}_2 ∧  b^{10, 64}_1 ∧  b^{10, 64}_0 ∧ true) 
c  in CNF:
c     b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ false 
c  in DIMACS:
 11225 -11226 -11227  0
c  -3 does not represent an automaton state.
c    -( b^{10, 64}_2 ∧  b^{10, 64}_1 ∧  b^{10, 64}_0 ∧ true) 
c  in CNF:
c    -b^{10, 64}_2 ∨ -b^{10, 64}_1 ∨ -b^{10, 64}_0 ∨ false 
c  in DIMACS:
-11225 -11226 -11227  0

c i = 65
c  -2+1 --> -1
c    ( b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧  p_650) -> ( b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0)
c  in CNF:
c    -b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨  b^{10, 66}_2
c    -b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_1
c    -b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨  b^{10, 66}_0
c  in DIMACS:
-11228 -11229  11230 -650  11231 0
-11228 -11229  11230 -650 -11232 0
-11228 -11229  11230 -650  11233 0

c  -1+1 --> 0
c    ( b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0 ∧  p_650) -> (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧ -b^{10, 66}_0)
c  in CNF:
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_2
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_1
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_0
c  in DIMACS:
-11228  11229 -11230 -650 -11231 0
-11228  11229 -11230 -650 -11232 0
-11228  11229 -11230 -650 -11233 0

c  0+1 --> 1
c    (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧  p_650) -> (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0)
c  in CNF:
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_2
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_1
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨  b^{10, 66}_0
c  in DIMACS:
 11228  11229  11230 -650 -11231 0
 11228  11229  11230 -650 -11232 0
 11228  11229  11230 -650  11233 0

c  1+1 --> 2
c    (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0 ∧  p_650) -> (-b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0)
c  in CNF:
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_2
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨  b^{10, 66}_1
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ -p_650 ∨ -b^{10, 66}_0
c  in DIMACS:
 11228  11229 -11230 -650 -11231 0
 11228  11229 -11230 -650  11232 0
 11228  11229 -11230 -650 -11233 0

c  2+1 --> break 
c    (-b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧  p_650) -> break
c  in CNF:
c     b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 11228 -11229  11230 -650 1162 0


c  2-1 --> 1
c    (-b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧ -p_650) -> (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0)
c  in CNF:
c     b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_2
c     b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_1
c     b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨  b^{10, 66}_0
c  in DIMACS:
 11228 -11229  11230  650 -11231 0
 11228 -11229  11230  650 -11232 0
 11228 -11229  11230  650  11233 0

c  1-1 --> 0
c    (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0 ∧ -p_650) -> (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧ -b^{10, 66}_0)
c  in CNF:
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_2
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_1
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_0
c  in DIMACS:
 11228  11229 -11230  650 -11231 0
 11228  11229 -11230  650 -11232 0
 11228  11229 -11230  650 -11233 0

c  0-1 --> -1
c    (-b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧ -p_650) -> ( b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0)
c  in CNF:
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨  b^{10, 66}_2
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_1
c     b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨  b^{10, 66}_0
c  in DIMACS:
 11228  11229  11230  650  11231 0
 11228  11229  11230  650 -11232 0
 11228  11229  11230  650  11233 0

c  -1-1 --> -2
c    ( b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧  b^{10, 65}_0 ∧ -p_650) -> ( b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0)
c  in CNF:
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨  b^{10, 66}_2
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨  b^{10, 66}_1
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨  p_650 ∨ -b^{10, 66}_0
c  in DIMACS:
-11228  11229 -11230  650  11231 0
-11228  11229 -11230  650  11232 0
-11228  11229 -11230  650 -11233 0

c  -2-1 --> break 
c    ( b^{10, 65}_2 ∧  b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨  b^{10, 65}_0 ∨  p_650 ∨ break
c  in DIMACS:
-11228 -11229  11230  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 65}_2 ∧ -b^{10, 65}_1 ∧ -b^{10, 65}_0 ∧ true) 
c  in CNF:
c    -b^{10, 65}_2 ∨  b^{10, 65}_1 ∨  b^{10, 65}_0 ∨ false 
c  in DIMACS:
-11228  11229  11230  0

c  3 does not represent an automaton state.
c    -(-b^{10, 65}_2 ∧  b^{10, 65}_1 ∧  b^{10, 65}_0 ∧ true) 
c  in CNF:
c     b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ false 
c  in DIMACS:
 11228 -11229 -11230  0
c  -3 does not represent an automaton state.
c    -( b^{10, 65}_2 ∧  b^{10, 65}_1 ∧  b^{10, 65}_0 ∧ true) 
c  in CNF:
c    -b^{10, 65}_2 ∨ -b^{10, 65}_1 ∨ -b^{10, 65}_0 ∨ false 
c  in DIMACS:
-11228 -11229 -11230  0

c i = 66
c  -2+1 --> -1
c    ( b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧  p_660) -> ( b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0)
c  in CNF:
c    -b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨  b^{10, 67}_2
c    -b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_1
c    -b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨  b^{10, 67}_0
c  in DIMACS:
-11231 -11232  11233 -660  11234 0
-11231 -11232  11233 -660 -11235 0
-11231 -11232  11233 -660  11236 0

c  -1+1 --> 0
c    ( b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0 ∧  p_660) -> (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧ -b^{10, 67}_0)
c  in CNF:
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_2
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_1
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_0
c  in DIMACS:
-11231  11232 -11233 -660 -11234 0
-11231  11232 -11233 -660 -11235 0
-11231  11232 -11233 -660 -11236 0

c  0+1 --> 1
c    (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧  p_660) -> (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0)
c  in CNF:
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_2
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_1
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨  b^{10, 67}_0
c  in DIMACS:
 11231  11232  11233 -660 -11234 0
 11231  11232  11233 -660 -11235 0
 11231  11232  11233 -660  11236 0

c  1+1 --> 2
c    (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0 ∧  p_660) -> (-b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0)
c  in CNF:
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_2
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨  b^{10, 67}_1
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ -p_660 ∨ -b^{10, 67}_0
c  in DIMACS:
 11231  11232 -11233 -660 -11234 0
 11231  11232 -11233 -660  11235 0
 11231  11232 -11233 -660 -11236 0

c  2+1 --> break 
c    (-b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧  p_660) -> break
c  in CNF:
c     b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 11231 -11232  11233 -660 1162 0


c  2-1 --> 1
c    (-b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧ -p_660) -> (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0)
c  in CNF:
c     b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_2
c     b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_1
c     b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨  b^{10, 67}_0
c  in DIMACS:
 11231 -11232  11233  660 -11234 0
 11231 -11232  11233  660 -11235 0
 11231 -11232  11233  660  11236 0

c  1-1 --> 0
c    (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0 ∧ -p_660) -> (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧ -b^{10, 67}_0)
c  in CNF:
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_2
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_1
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_0
c  in DIMACS:
 11231  11232 -11233  660 -11234 0
 11231  11232 -11233  660 -11235 0
 11231  11232 -11233  660 -11236 0

c  0-1 --> -1
c    (-b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧ -p_660) -> ( b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0)
c  in CNF:
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨  b^{10, 67}_2
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_1
c     b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨  b^{10, 67}_0
c  in DIMACS:
 11231  11232  11233  660  11234 0
 11231  11232  11233  660 -11235 0
 11231  11232  11233  660  11236 0

c  -1-1 --> -2
c    ( b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧  b^{10, 66}_0 ∧ -p_660) -> ( b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0)
c  in CNF:
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨  b^{10, 67}_2
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨  b^{10, 67}_1
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨  p_660 ∨ -b^{10, 67}_0
c  in DIMACS:
-11231  11232 -11233  660  11234 0
-11231  11232 -11233  660  11235 0
-11231  11232 -11233  660 -11236 0

c  -2-1 --> break 
c    ( b^{10, 66}_2 ∧  b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨  b^{10, 66}_0 ∨  p_660 ∨ break
c  in DIMACS:
-11231 -11232  11233  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 66}_2 ∧ -b^{10, 66}_1 ∧ -b^{10, 66}_0 ∧ true) 
c  in CNF:
c    -b^{10, 66}_2 ∨  b^{10, 66}_1 ∨  b^{10, 66}_0 ∨ false 
c  in DIMACS:
-11231  11232  11233  0

c  3 does not represent an automaton state.
c    -(-b^{10, 66}_2 ∧  b^{10, 66}_1 ∧  b^{10, 66}_0 ∧ true) 
c  in CNF:
c     b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ false 
c  in DIMACS:
 11231 -11232 -11233  0
c  -3 does not represent an automaton state.
c    -( b^{10, 66}_2 ∧  b^{10, 66}_1 ∧  b^{10, 66}_0 ∧ true) 
c  in CNF:
c    -b^{10, 66}_2 ∨ -b^{10, 66}_1 ∨ -b^{10, 66}_0 ∨ false 
c  in DIMACS:
-11231 -11232 -11233  0

c i = 67
c  -2+1 --> -1
c    ( b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧  p_670) -> ( b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0)
c  in CNF:
c    -b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨  b^{10, 68}_2
c    -b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_1
c    -b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨  b^{10, 68}_0
c  in DIMACS:
-11234 -11235  11236 -670  11237 0
-11234 -11235  11236 -670 -11238 0
-11234 -11235  11236 -670  11239 0

c  -1+1 --> 0
c    ( b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0 ∧  p_670) -> (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧ -b^{10, 68}_0)
c  in CNF:
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_2
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_1
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_0
c  in DIMACS:
-11234  11235 -11236 -670 -11237 0
-11234  11235 -11236 -670 -11238 0
-11234  11235 -11236 -670 -11239 0

c  0+1 --> 1
c    (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧  p_670) -> (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0)
c  in CNF:
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_2
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_1
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨  b^{10, 68}_0
c  in DIMACS:
 11234  11235  11236 -670 -11237 0
 11234  11235  11236 -670 -11238 0
 11234  11235  11236 -670  11239 0

c  1+1 --> 2
c    (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0 ∧  p_670) -> (-b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0)
c  in CNF:
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_2
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨  b^{10, 68}_1
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ -p_670 ∨ -b^{10, 68}_0
c  in DIMACS:
 11234  11235 -11236 -670 -11237 0
 11234  11235 -11236 -670  11238 0
 11234  11235 -11236 -670 -11239 0

c  2+1 --> break 
c    (-b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧  p_670) -> break
c  in CNF:
c     b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 11234 -11235  11236 -670 1162 0


c  2-1 --> 1
c    (-b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧ -p_670) -> (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0)
c  in CNF:
c     b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_2
c     b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_1
c     b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨  b^{10, 68}_0
c  in DIMACS:
 11234 -11235  11236  670 -11237 0
 11234 -11235  11236  670 -11238 0
 11234 -11235  11236  670  11239 0

c  1-1 --> 0
c    (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0 ∧ -p_670) -> (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧ -b^{10, 68}_0)
c  in CNF:
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_2
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_1
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_0
c  in DIMACS:
 11234  11235 -11236  670 -11237 0
 11234  11235 -11236  670 -11238 0
 11234  11235 -11236  670 -11239 0

c  0-1 --> -1
c    (-b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧ -p_670) -> ( b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0)
c  in CNF:
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨  b^{10, 68}_2
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_1
c     b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨  b^{10, 68}_0
c  in DIMACS:
 11234  11235  11236  670  11237 0
 11234  11235  11236  670 -11238 0
 11234  11235  11236  670  11239 0

c  -1-1 --> -2
c    ( b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧  b^{10, 67}_0 ∧ -p_670) -> ( b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0)
c  in CNF:
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨  b^{10, 68}_2
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨  b^{10, 68}_1
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨  p_670 ∨ -b^{10, 68}_0
c  in DIMACS:
-11234  11235 -11236  670  11237 0
-11234  11235 -11236  670  11238 0
-11234  11235 -11236  670 -11239 0

c  -2-1 --> break 
c    ( b^{10, 67}_2 ∧  b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨  b^{10, 67}_0 ∨  p_670 ∨ break
c  in DIMACS:
-11234 -11235  11236  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 67}_2 ∧ -b^{10, 67}_1 ∧ -b^{10, 67}_0 ∧ true) 
c  in CNF:
c    -b^{10, 67}_2 ∨  b^{10, 67}_1 ∨  b^{10, 67}_0 ∨ false 
c  in DIMACS:
-11234  11235  11236  0

c  3 does not represent an automaton state.
c    -(-b^{10, 67}_2 ∧  b^{10, 67}_1 ∧  b^{10, 67}_0 ∧ true) 
c  in CNF:
c     b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ false 
c  in DIMACS:
 11234 -11235 -11236  0
c  -3 does not represent an automaton state.
c    -( b^{10, 67}_2 ∧  b^{10, 67}_1 ∧  b^{10, 67}_0 ∧ true) 
c  in CNF:
c    -b^{10, 67}_2 ∨ -b^{10, 67}_1 ∨ -b^{10, 67}_0 ∨ false 
c  in DIMACS:
-11234 -11235 -11236  0

c i = 68
c  -2+1 --> -1
c    ( b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧  p_680) -> ( b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0)
c  in CNF:
c    -b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨  b^{10, 69}_2
c    -b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_1
c    -b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨  b^{10, 69}_0
c  in DIMACS:
-11237 -11238  11239 -680  11240 0
-11237 -11238  11239 -680 -11241 0
-11237 -11238  11239 -680  11242 0

c  -1+1 --> 0
c    ( b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0 ∧  p_680) -> (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧ -b^{10, 69}_0)
c  in CNF:
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_2
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_1
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_0
c  in DIMACS:
-11237  11238 -11239 -680 -11240 0
-11237  11238 -11239 -680 -11241 0
-11237  11238 -11239 -680 -11242 0

c  0+1 --> 1
c    (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧  p_680) -> (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0)
c  in CNF:
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_2
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_1
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨  b^{10, 69}_0
c  in DIMACS:
 11237  11238  11239 -680 -11240 0
 11237  11238  11239 -680 -11241 0
 11237  11238  11239 -680  11242 0

c  1+1 --> 2
c    (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0 ∧  p_680) -> (-b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0)
c  in CNF:
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_2
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨  b^{10, 69}_1
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ -p_680 ∨ -b^{10, 69}_0
c  in DIMACS:
 11237  11238 -11239 -680 -11240 0
 11237  11238 -11239 -680  11241 0
 11237  11238 -11239 -680 -11242 0

c  2+1 --> break 
c    (-b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧  p_680) -> break
c  in CNF:
c     b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 11237 -11238  11239 -680 1162 0


c  2-1 --> 1
c    (-b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧ -p_680) -> (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0)
c  in CNF:
c     b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_2
c     b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_1
c     b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨  b^{10, 69}_0
c  in DIMACS:
 11237 -11238  11239  680 -11240 0
 11237 -11238  11239  680 -11241 0
 11237 -11238  11239  680  11242 0

c  1-1 --> 0
c    (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0 ∧ -p_680) -> (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧ -b^{10, 69}_0)
c  in CNF:
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_2
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_1
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_0
c  in DIMACS:
 11237  11238 -11239  680 -11240 0
 11237  11238 -11239  680 -11241 0
 11237  11238 -11239  680 -11242 0

c  0-1 --> -1
c    (-b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧ -p_680) -> ( b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0)
c  in CNF:
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨  b^{10, 69}_2
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_1
c     b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨  b^{10, 69}_0
c  in DIMACS:
 11237  11238  11239  680  11240 0
 11237  11238  11239  680 -11241 0
 11237  11238  11239  680  11242 0

c  -1-1 --> -2
c    ( b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧  b^{10, 68}_0 ∧ -p_680) -> ( b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0)
c  in CNF:
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨  b^{10, 69}_2
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨  b^{10, 69}_1
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨  p_680 ∨ -b^{10, 69}_0
c  in DIMACS:
-11237  11238 -11239  680  11240 0
-11237  11238 -11239  680  11241 0
-11237  11238 -11239  680 -11242 0

c  -2-1 --> break 
c    ( b^{10, 68}_2 ∧  b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨  b^{10, 68}_0 ∨  p_680 ∨ break
c  in DIMACS:
-11237 -11238  11239  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 68}_2 ∧ -b^{10, 68}_1 ∧ -b^{10, 68}_0 ∧ true) 
c  in CNF:
c    -b^{10, 68}_2 ∨  b^{10, 68}_1 ∨  b^{10, 68}_0 ∨ false 
c  in DIMACS:
-11237  11238  11239  0

c  3 does not represent an automaton state.
c    -(-b^{10, 68}_2 ∧  b^{10, 68}_1 ∧  b^{10, 68}_0 ∧ true) 
c  in CNF:
c     b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ false 
c  in DIMACS:
 11237 -11238 -11239  0
c  -3 does not represent an automaton state.
c    -( b^{10, 68}_2 ∧  b^{10, 68}_1 ∧  b^{10, 68}_0 ∧ true) 
c  in CNF:
c    -b^{10, 68}_2 ∨ -b^{10, 68}_1 ∨ -b^{10, 68}_0 ∨ false 
c  in DIMACS:
-11237 -11238 -11239  0

c i = 69
c  -2+1 --> -1
c    ( b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧  p_690) -> ( b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0)
c  in CNF:
c    -b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨  b^{10, 70}_2
c    -b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_1
c    -b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨  b^{10, 70}_0
c  in DIMACS:
-11240 -11241  11242 -690  11243 0
-11240 -11241  11242 -690 -11244 0
-11240 -11241  11242 -690  11245 0

c  -1+1 --> 0
c    ( b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0 ∧  p_690) -> (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧ -b^{10, 70}_0)
c  in CNF:
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_2
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_1
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_0
c  in DIMACS:
-11240  11241 -11242 -690 -11243 0
-11240  11241 -11242 -690 -11244 0
-11240  11241 -11242 -690 -11245 0

c  0+1 --> 1
c    (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧  p_690) -> (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0)
c  in CNF:
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_2
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_1
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨  b^{10, 70}_0
c  in DIMACS:
 11240  11241  11242 -690 -11243 0
 11240  11241  11242 -690 -11244 0
 11240  11241  11242 -690  11245 0

c  1+1 --> 2
c    (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0 ∧  p_690) -> (-b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0)
c  in CNF:
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_2
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨  b^{10, 70}_1
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ -p_690 ∨ -b^{10, 70}_0
c  in DIMACS:
 11240  11241 -11242 -690 -11243 0
 11240  11241 -11242 -690  11244 0
 11240  11241 -11242 -690 -11245 0

c  2+1 --> break 
c    (-b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧  p_690) -> break
c  in CNF:
c     b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 11240 -11241  11242 -690 1162 0


c  2-1 --> 1
c    (-b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧ -p_690) -> (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0)
c  in CNF:
c     b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_2
c     b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_1
c     b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨  b^{10, 70}_0
c  in DIMACS:
 11240 -11241  11242  690 -11243 0
 11240 -11241  11242  690 -11244 0
 11240 -11241  11242  690  11245 0

c  1-1 --> 0
c    (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0 ∧ -p_690) -> (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧ -b^{10, 70}_0)
c  in CNF:
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_2
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_1
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_0
c  in DIMACS:
 11240  11241 -11242  690 -11243 0
 11240  11241 -11242  690 -11244 0
 11240  11241 -11242  690 -11245 0

c  0-1 --> -1
c    (-b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧ -p_690) -> ( b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0)
c  in CNF:
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨  b^{10, 70}_2
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_1
c     b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨  b^{10, 70}_0
c  in DIMACS:
 11240  11241  11242  690  11243 0
 11240  11241  11242  690 -11244 0
 11240  11241  11242  690  11245 0

c  -1-1 --> -2
c    ( b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧  b^{10, 69}_0 ∧ -p_690) -> ( b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0)
c  in CNF:
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨  b^{10, 70}_2
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨  b^{10, 70}_1
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨  p_690 ∨ -b^{10, 70}_0
c  in DIMACS:
-11240  11241 -11242  690  11243 0
-11240  11241 -11242  690  11244 0
-11240  11241 -11242  690 -11245 0

c  -2-1 --> break 
c    ( b^{10, 69}_2 ∧  b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨  b^{10, 69}_0 ∨  p_690 ∨ break
c  in DIMACS:
-11240 -11241  11242  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 69}_2 ∧ -b^{10, 69}_1 ∧ -b^{10, 69}_0 ∧ true) 
c  in CNF:
c    -b^{10, 69}_2 ∨  b^{10, 69}_1 ∨  b^{10, 69}_0 ∨ false 
c  in DIMACS:
-11240  11241  11242  0

c  3 does not represent an automaton state.
c    -(-b^{10, 69}_2 ∧  b^{10, 69}_1 ∧  b^{10, 69}_0 ∧ true) 
c  in CNF:
c     b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ false 
c  in DIMACS:
 11240 -11241 -11242  0
c  -3 does not represent an automaton state.
c    -( b^{10, 69}_2 ∧  b^{10, 69}_1 ∧  b^{10, 69}_0 ∧ true) 
c  in CNF:
c    -b^{10, 69}_2 ∨ -b^{10, 69}_1 ∨ -b^{10, 69}_0 ∨ false 
c  in DIMACS:
-11240 -11241 -11242  0

c i = 70
c  -2+1 --> -1
c    ( b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧  p_700) -> ( b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0)
c  in CNF:
c    -b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨  b^{10, 71}_2
c    -b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_1
c    -b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨  b^{10, 71}_0
c  in DIMACS:
-11243 -11244  11245 -700  11246 0
-11243 -11244  11245 -700 -11247 0
-11243 -11244  11245 -700  11248 0

c  -1+1 --> 0
c    ( b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0 ∧  p_700) -> (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧ -b^{10, 71}_0)
c  in CNF:
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_2
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_1
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_0
c  in DIMACS:
-11243  11244 -11245 -700 -11246 0
-11243  11244 -11245 -700 -11247 0
-11243  11244 -11245 -700 -11248 0

c  0+1 --> 1
c    (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧  p_700) -> (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0)
c  in CNF:
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_2
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_1
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨  b^{10, 71}_0
c  in DIMACS:
 11243  11244  11245 -700 -11246 0
 11243  11244  11245 -700 -11247 0
 11243  11244  11245 -700  11248 0

c  1+1 --> 2
c    (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0 ∧  p_700) -> (-b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0)
c  in CNF:
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_2
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨  b^{10, 71}_1
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ -p_700 ∨ -b^{10, 71}_0
c  in DIMACS:
 11243  11244 -11245 -700 -11246 0
 11243  11244 -11245 -700  11247 0
 11243  11244 -11245 -700 -11248 0

c  2+1 --> break 
c    (-b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧  p_700) -> break
c  in CNF:
c     b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 11243 -11244  11245 -700 1162 0


c  2-1 --> 1
c    (-b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧ -p_700) -> (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0)
c  in CNF:
c     b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_2
c     b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_1
c     b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨  b^{10, 71}_0
c  in DIMACS:
 11243 -11244  11245  700 -11246 0
 11243 -11244  11245  700 -11247 0
 11243 -11244  11245  700  11248 0

c  1-1 --> 0
c    (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0 ∧ -p_700) -> (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧ -b^{10, 71}_0)
c  in CNF:
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_2
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_1
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_0
c  in DIMACS:
 11243  11244 -11245  700 -11246 0
 11243  11244 -11245  700 -11247 0
 11243  11244 -11245  700 -11248 0

c  0-1 --> -1
c    (-b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧ -p_700) -> ( b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0)
c  in CNF:
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨  b^{10, 71}_2
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_1
c     b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨  b^{10, 71}_0
c  in DIMACS:
 11243  11244  11245  700  11246 0
 11243  11244  11245  700 -11247 0
 11243  11244  11245  700  11248 0

c  -1-1 --> -2
c    ( b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧  b^{10, 70}_0 ∧ -p_700) -> ( b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0)
c  in CNF:
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨  b^{10, 71}_2
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨  b^{10, 71}_1
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨  p_700 ∨ -b^{10, 71}_0
c  in DIMACS:
-11243  11244 -11245  700  11246 0
-11243  11244 -11245  700  11247 0
-11243  11244 -11245  700 -11248 0

c  -2-1 --> break 
c    ( b^{10, 70}_2 ∧  b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨  b^{10, 70}_0 ∨  p_700 ∨ break
c  in DIMACS:
-11243 -11244  11245  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 70}_2 ∧ -b^{10, 70}_1 ∧ -b^{10, 70}_0 ∧ true) 
c  in CNF:
c    -b^{10, 70}_2 ∨  b^{10, 70}_1 ∨  b^{10, 70}_0 ∨ false 
c  in DIMACS:
-11243  11244  11245  0

c  3 does not represent an automaton state.
c    -(-b^{10, 70}_2 ∧  b^{10, 70}_1 ∧  b^{10, 70}_0 ∧ true) 
c  in CNF:
c     b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ false 
c  in DIMACS:
 11243 -11244 -11245  0
c  -3 does not represent an automaton state.
c    -( b^{10, 70}_2 ∧  b^{10, 70}_1 ∧  b^{10, 70}_0 ∧ true) 
c  in CNF:
c    -b^{10, 70}_2 ∨ -b^{10, 70}_1 ∨ -b^{10, 70}_0 ∨ false 
c  in DIMACS:
-11243 -11244 -11245  0

c i = 71
c  -2+1 --> -1
c    ( b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧  p_710) -> ( b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0)
c  in CNF:
c    -b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨  b^{10, 72}_2
c    -b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_1
c    -b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨  b^{10, 72}_0
c  in DIMACS:
-11246 -11247  11248 -710  11249 0
-11246 -11247  11248 -710 -11250 0
-11246 -11247  11248 -710  11251 0

c  -1+1 --> 0
c    ( b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0 ∧  p_710) -> (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧ -b^{10, 72}_0)
c  in CNF:
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_2
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_1
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_0
c  in DIMACS:
-11246  11247 -11248 -710 -11249 0
-11246  11247 -11248 -710 -11250 0
-11246  11247 -11248 -710 -11251 0

c  0+1 --> 1
c    (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧  p_710) -> (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0)
c  in CNF:
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_2
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_1
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨  b^{10, 72}_0
c  in DIMACS:
 11246  11247  11248 -710 -11249 0
 11246  11247  11248 -710 -11250 0
 11246  11247  11248 -710  11251 0

c  1+1 --> 2
c    (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0 ∧  p_710) -> (-b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0)
c  in CNF:
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_2
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨  b^{10, 72}_1
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ -p_710 ∨ -b^{10, 72}_0
c  in DIMACS:
 11246  11247 -11248 -710 -11249 0
 11246  11247 -11248 -710  11250 0
 11246  11247 -11248 -710 -11251 0

c  2+1 --> break 
c    (-b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧  p_710) -> break
c  in CNF:
c     b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 11246 -11247  11248 -710 1162 0


c  2-1 --> 1
c    (-b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧ -p_710) -> (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0)
c  in CNF:
c     b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_2
c     b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_1
c     b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨  b^{10, 72}_0
c  in DIMACS:
 11246 -11247  11248  710 -11249 0
 11246 -11247  11248  710 -11250 0
 11246 -11247  11248  710  11251 0

c  1-1 --> 0
c    (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0 ∧ -p_710) -> (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧ -b^{10, 72}_0)
c  in CNF:
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_2
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_1
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_0
c  in DIMACS:
 11246  11247 -11248  710 -11249 0
 11246  11247 -11248  710 -11250 0
 11246  11247 -11248  710 -11251 0

c  0-1 --> -1
c    (-b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧ -p_710) -> ( b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0)
c  in CNF:
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨  b^{10, 72}_2
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_1
c     b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨  b^{10, 72}_0
c  in DIMACS:
 11246  11247  11248  710  11249 0
 11246  11247  11248  710 -11250 0
 11246  11247  11248  710  11251 0

c  -1-1 --> -2
c    ( b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧  b^{10, 71}_0 ∧ -p_710) -> ( b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0)
c  in CNF:
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨  b^{10, 72}_2
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨  b^{10, 72}_1
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨  p_710 ∨ -b^{10, 72}_0
c  in DIMACS:
-11246  11247 -11248  710  11249 0
-11246  11247 -11248  710  11250 0
-11246  11247 -11248  710 -11251 0

c  -2-1 --> break 
c    ( b^{10, 71}_2 ∧  b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨  b^{10, 71}_0 ∨  p_710 ∨ break
c  in DIMACS:
-11246 -11247  11248  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 71}_2 ∧ -b^{10, 71}_1 ∧ -b^{10, 71}_0 ∧ true) 
c  in CNF:
c    -b^{10, 71}_2 ∨  b^{10, 71}_1 ∨  b^{10, 71}_0 ∨ false 
c  in DIMACS:
-11246  11247  11248  0

c  3 does not represent an automaton state.
c    -(-b^{10, 71}_2 ∧  b^{10, 71}_1 ∧  b^{10, 71}_0 ∧ true) 
c  in CNF:
c     b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ false 
c  in DIMACS:
 11246 -11247 -11248  0
c  -3 does not represent an automaton state.
c    -( b^{10, 71}_2 ∧  b^{10, 71}_1 ∧  b^{10, 71}_0 ∧ true) 
c  in CNF:
c    -b^{10, 71}_2 ∨ -b^{10, 71}_1 ∨ -b^{10, 71}_0 ∨ false 
c  in DIMACS:
-11246 -11247 -11248  0

c i = 72
c  -2+1 --> -1
c    ( b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧  p_720) -> ( b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0)
c  in CNF:
c    -b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨  b^{10, 73}_2
c    -b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_1
c    -b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨  b^{10, 73}_0
c  in DIMACS:
-11249 -11250  11251 -720  11252 0
-11249 -11250  11251 -720 -11253 0
-11249 -11250  11251 -720  11254 0

c  -1+1 --> 0
c    ( b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0 ∧  p_720) -> (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧ -b^{10, 73}_0)
c  in CNF:
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_2
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_1
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_0
c  in DIMACS:
-11249  11250 -11251 -720 -11252 0
-11249  11250 -11251 -720 -11253 0
-11249  11250 -11251 -720 -11254 0

c  0+1 --> 1
c    (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧  p_720) -> (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0)
c  in CNF:
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_2
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_1
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨  b^{10, 73}_0
c  in DIMACS:
 11249  11250  11251 -720 -11252 0
 11249  11250  11251 -720 -11253 0
 11249  11250  11251 -720  11254 0

c  1+1 --> 2
c    (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0 ∧  p_720) -> (-b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0)
c  in CNF:
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_2
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨  b^{10, 73}_1
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ -p_720 ∨ -b^{10, 73}_0
c  in DIMACS:
 11249  11250 -11251 -720 -11252 0
 11249  11250 -11251 -720  11253 0
 11249  11250 -11251 -720 -11254 0

c  2+1 --> break 
c    (-b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧  p_720) -> break
c  in CNF:
c     b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 11249 -11250  11251 -720 1162 0


c  2-1 --> 1
c    (-b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧ -p_720) -> (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0)
c  in CNF:
c     b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_2
c     b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_1
c     b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨  b^{10, 73}_0
c  in DIMACS:
 11249 -11250  11251  720 -11252 0
 11249 -11250  11251  720 -11253 0
 11249 -11250  11251  720  11254 0

c  1-1 --> 0
c    (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0 ∧ -p_720) -> (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧ -b^{10, 73}_0)
c  in CNF:
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_2
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_1
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_0
c  in DIMACS:
 11249  11250 -11251  720 -11252 0
 11249  11250 -11251  720 -11253 0
 11249  11250 -11251  720 -11254 0

c  0-1 --> -1
c    (-b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧ -p_720) -> ( b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0)
c  in CNF:
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨  b^{10, 73}_2
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_1
c     b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨  b^{10, 73}_0
c  in DIMACS:
 11249  11250  11251  720  11252 0
 11249  11250  11251  720 -11253 0
 11249  11250  11251  720  11254 0

c  -1-1 --> -2
c    ( b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧  b^{10, 72}_0 ∧ -p_720) -> ( b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0)
c  in CNF:
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨  b^{10, 73}_2
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨  b^{10, 73}_1
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨  p_720 ∨ -b^{10, 73}_0
c  in DIMACS:
-11249  11250 -11251  720  11252 0
-11249  11250 -11251  720  11253 0
-11249  11250 -11251  720 -11254 0

c  -2-1 --> break 
c    ( b^{10, 72}_2 ∧  b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨  b^{10, 72}_0 ∨  p_720 ∨ break
c  in DIMACS:
-11249 -11250  11251  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 72}_2 ∧ -b^{10, 72}_1 ∧ -b^{10, 72}_0 ∧ true) 
c  in CNF:
c    -b^{10, 72}_2 ∨  b^{10, 72}_1 ∨  b^{10, 72}_0 ∨ false 
c  in DIMACS:
-11249  11250  11251  0

c  3 does not represent an automaton state.
c    -(-b^{10, 72}_2 ∧  b^{10, 72}_1 ∧  b^{10, 72}_0 ∧ true) 
c  in CNF:
c     b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ false 
c  in DIMACS:
 11249 -11250 -11251  0
c  -3 does not represent an automaton state.
c    -( b^{10, 72}_2 ∧  b^{10, 72}_1 ∧  b^{10, 72}_0 ∧ true) 
c  in CNF:
c    -b^{10, 72}_2 ∨ -b^{10, 72}_1 ∨ -b^{10, 72}_0 ∨ false 
c  in DIMACS:
-11249 -11250 -11251  0

c i = 73
c  -2+1 --> -1
c    ( b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧  p_730) -> ( b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0)
c  in CNF:
c    -b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨  b^{10, 74}_2
c    -b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_1
c    -b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨  b^{10, 74}_0
c  in DIMACS:
-11252 -11253  11254 -730  11255 0
-11252 -11253  11254 -730 -11256 0
-11252 -11253  11254 -730  11257 0

c  -1+1 --> 0
c    ( b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0 ∧  p_730) -> (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧ -b^{10, 74}_0)
c  in CNF:
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_2
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_1
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_0
c  in DIMACS:
-11252  11253 -11254 -730 -11255 0
-11252  11253 -11254 -730 -11256 0
-11252  11253 -11254 -730 -11257 0

c  0+1 --> 1
c    (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧  p_730) -> (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0)
c  in CNF:
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_2
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_1
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨  b^{10, 74}_0
c  in DIMACS:
 11252  11253  11254 -730 -11255 0
 11252  11253  11254 -730 -11256 0
 11252  11253  11254 -730  11257 0

c  1+1 --> 2
c    (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0 ∧  p_730) -> (-b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0)
c  in CNF:
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_2
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨  b^{10, 74}_1
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ -p_730 ∨ -b^{10, 74}_0
c  in DIMACS:
 11252  11253 -11254 -730 -11255 0
 11252  11253 -11254 -730  11256 0
 11252  11253 -11254 -730 -11257 0

c  2+1 --> break 
c    (-b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧  p_730) -> break
c  in CNF:
c     b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 11252 -11253  11254 -730 1162 0


c  2-1 --> 1
c    (-b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧ -p_730) -> (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0)
c  in CNF:
c     b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_2
c     b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_1
c     b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨  b^{10, 74}_0
c  in DIMACS:
 11252 -11253  11254  730 -11255 0
 11252 -11253  11254  730 -11256 0
 11252 -11253  11254  730  11257 0

c  1-1 --> 0
c    (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0 ∧ -p_730) -> (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧ -b^{10, 74}_0)
c  in CNF:
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_2
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_1
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_0
c  in DIMACS:
 11252  11253 -11254  730 -11255 0
 11252  11253 -11254  730 -11256 0
 11252  11253 -11254  730 -11257 0

c  0-1 --> -1
c    (-b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧ -p_730) -> ( b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0)
c  in CNF:
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨  b^{10, 74}_2
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_1
c     b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨  b^{10, 74}_0
c  in DIMACS:
 11252  11253  11254  730  11255 0
 11252  11253  11254  730 -11256 0
 11252  11253  11254  730  11257 0

c  -1-1 --> -2
c    ( b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧  b^{10, 73}_0 ∧ -p_730) -> ( b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0)
c  in CNF:
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨  b^{10, 74}_2
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨  b^{10, 74}_1
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨  p_730 ∨ -b^{10, 74}_0
c  in DIMACS:
-11252  11253 -11254  730  11255 0
-11252  11253 -11254  730  11256 0
-11252  11253 -11254  730 -11257 0

c  -2-1 --> break 
c    ( b^{10, 73}_2 ∧  b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨  b^{10, 73}_0 ∨  p_730 ∨ break
c  in DIMACS:
-11252 -11253  11254  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 73}_2 ∧ -b^{10, 73}_1 ∧ -b^{10, 73}_0 ∧ true) 
c  in CNF:
c    -b^{10, 73}_2 ∨  b^{10, 73}_1 ∨  b^{10, 73}_0 ∨ false 
c  in DIMACS:
-11252  11253  11254  0

c  3 does not represent an automaton state.
c    -(-b^{10, 73}_2 ∧  b^{10, 73}_1 ∧  b^{10, 73}_0 ∧ true) 
c  in CNF:
c     b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ false 
c  in DIMACS:
 11252 -11253 -11254  0
c  -3 does not represent an automaton state.
c    -( b^{10, 73}_2 ∧  b^{10, 73}_1 ∧  b^{10, 73}_0 ∧ true) 
c  in CNF:
c    -b^{10, 73}_2 ∨ -b^{10, 73}_1 ∨ -b^{10, 73}_0 ∨ false 
c  in DIMACS:
-11252 -11253 -11254  0

c i = 74
c  -2+1 --> -1
c    ( b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧  p_740) -> ( b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0)
c  in CNF:
c    -b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨  b^{10, 75}_2
c    -b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_1
c    -b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨  b^{10, 75}_0
c  in DIMACS:
-11255 -11256  11257 -740  11258 0
-11255 -11256  11257 -740 -11259 0
-11255 -11256  11257 -740  11260 0

c  -1+1 --> 0
c    ( b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0 ∧  p_740) -> (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧ -b^{10, 75}_0)
c  in CNF:
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_2
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_1
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_0
c  in DIMACS:
-11255  11256 -11257 -740 -11258 0
-11255  11256 -11257 -740 -11259 0
-11255  11256 -11257 -740 -11260 0

c  0+1 --> 1
c    (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧  p_740) -> (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0)
c  in CNF:
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_2
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_1
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨  b^{10, 75}_0
c  in DIMACS:
 11255  11256  11257 -740 -11258 0
 11255  11256  11257 -740 -11259 0
 11255  11256  11257 -740  11260 0

c  1+1 --> 2
c    (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0 ∧  p_740) -> (-b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0)
c  in CNF:
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_2
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨  b^{10, 75}_1
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ -p_740 ∨ -b^{10, 75}_0
c  in DIMACS:
 11255  11256 -11257 -740 -11258 0
 11255  11256 -11257 -740  11259 0
 11255  11256 -11257 -740 -11260 0

c  2+1 --> break 
c    (-b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧  p_740) -> break
c  in CNF:
c     b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 11255 -11256  11257 -740 1162 0


c  2-1 --> 1
c    (-b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧ -p_740) -> (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0)
c  in CNF:
c     b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_2
c     b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_1
c     b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨  b^{10, 75}_0
c  in DIMACS:
 11255 -11256  11257  740 -11258 0
 11255 -11256  11257  740 -11259 0
 11255 -11256  11257  740  11260 0

c  1-1 --> 0
c    (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0 ∧ -p_740) -> (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧ -b^{10, 75}_0)
c  in CNF:
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_2
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_1
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_0
c  in DIMACS:
 11255  11256 -11257  740 -11258 0
 11255  11256 -11257  740 -11259 0
 11255  11256 -11257  740 -11260 0

c  0-1 --> -1
c    (-b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧ -p_740) -> ( b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0)
c  in CNF:
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨  b^{10, 75}_2
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_1
c     b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨  b^{10, 75}_0
c  in DIMACS:
 11255  11256  11257  740  11258 0
 11255  11256  11257  740 -11259 0
 11255  11256  11257  740  11260 0

c  -1-1 --> -2
c    ( b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧  b^{10, 74}_0 ∧ -p_740) -> ( b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0)
c  in CNF:
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨  b^{10, 75}_2
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨  b^{10, 75}_1
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨  p_740 ∨ -b^{10, 75}_0
c  in DIMACS:
-11255  11256 -11257  740  11258 0
-11255  11256 -11257  740  11259 0
-11255  11256 -11257  740 -11260 0

c  -2-1 --> break 
c    ( b^{10, 74}_2 ∧  b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨  b^{10, 74}_0 ∨  p_740 ∨ break
c  in DIMACS:
-11255 -11256  11257  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 74}_2 ∧ -b^{10, 74}_1 ∧ -b^{10, 74}_0 ∧ true) 
c  in CNF:
c    -b^{10, 74}_2 ∨  b^{10, 74}_1 ∨  b^{10, 74}_0 ∨ false 
c  in DIMACS:
-11255  11256  11257  0

c  3 does not represent an automaton state.
c    -(-b^{10, 74}_2 ∧  b^{10, 74}_1 ∧  b^{10, 74}_0 ∧ true) 
c  in CNF:
c     b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ false 
c  in DIMACS:
 11255 -11256 -11257  0
c  -3 does not represent an automaton state.
c    -( b^{10, 74}_2 ∧  b^{10, 74}_1 ∧  b^{10, 74}_0 ∧ true) 
c  in CNF:
c    -b^{10, 74}_2 ∨ -b^{10, 74}_1 ∨ -b^{10, 74}_0 ∨ false 
c  in DIMACS:
-11255 -11256 -11257  0

c i = 75
c  -2+1 --> -1
c    ( b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧  p_750) -> ( b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0)
c  in CNF:
c    -b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨  b^{10, 76}_2
c    -b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_1
c    -b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨  b^{10, 76}_0
c  in DIMACS:
-11258 -11259  11260 -750  11261 0
-11258 -11259  11260 -750 -11262 0
-11258 -11259  11260 -750  11263 0

c  -1+1 --> 0
c    ( b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0 ∧  p_750) -> (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧ -b^{10, 76}_0)
c  in CNF:
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_2
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_1
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_0
c  in DIMACS:
-11258  11259 -11260 -750 -11261 0
-11258  11259 -11260 -750 -11262 0
-11258  11259 -11260 -750 -11263 0

c  0+1 --> 1
c    (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧  p_750) -> (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0)
c  in CNF:
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_2
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_1
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨  b^{10, 76}_0
c  in DIMACS:
 11258  11259  11260 -750 -11261 0
 11258  11259  11260 -750 -11262 0
 11258  11259  11260 -750  11263 0

c  1+1 --> 2
c    (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0 ∧  p_750) -> (-b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0)
c  in CNF:
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_2
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨  b^{10, 76}_1
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ -p_750 ∨ -b^{10, 76}_0
c  in DIMACS:
 11258  11259 -11260 -750 -11261 0
 11258  11259 -11260 -750  11262 0
 11258  11259 -11260 -750 -11263 0

c  2+1 --> break 
c    (-b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧  p_750) -> break
c  in CNF:
c     b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 11258 -11259  11260 -750 1162 0


c  2-1 --> 1
c    (-b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧ -p_750) -> (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0)
c  in CNF:
c     b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_2
c     b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_1
c     b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨  b^{10, 76}_0
c  in DIMACS:
 11258 -11259  11260  750 -11261 0
 11258 -11259  11260  750 -11262 0
 11258 -11259  11260  750  11263 0

c  1-1 --> 0
c    (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0 ∧ -p_750) -> (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧ -b^{10, 76}_0)
c  in CNF:
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_2
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_1
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_0
c  in DIMACS:
 11258  11259 -11260  750 -11261 0
 11258  11259 -11260  750 -11262 0
 11258  11259 -11260  750 -11263 0

c  0-1 --> -1
c    (-b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧ -p_750) -> ( b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0)
c  in CNF:
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨  b^{10, 76}_2
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_1
c     b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨  b^{10, 76}_0
c  in DIMACS:
 11258  11259  11260  750  11261 0
 11258  11259  11260  750 -11262 0
 11258  11259  11260  750  11263 0

c  -1-1 --> -2
c    ( b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧  b^{10, 75}_0 ∧ -p_750) -> ( b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0)
c  in CNF:
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨  b^{10, 76}_2
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨  b^{10, 76}_1
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨  p_750 ∨ -b^{10, 76}_0
c  in DIMACS:
-11258  11259 -11260  750  11261 0
-11258  11259 -11260  750  11262 0
-11258  11259 -11260  750 -11263 0

c  -2-1 --> break 
c    ( b^{10, 75}_2 ∧  b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨  b^{10, 75}_0 ∨  p_750 ∨ break
c  in DIMACS:
-11258 -11259  11260  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 75}_2 ∧ -b^{10, 75}_1 ∧ -b^{10, 75}_0 ∧ true) 
c  in CNF:
c    -b^{10, 75}_2 ∨  b^{10, 75}_1 ∨  b^{10, 75}_0 ∨ false 
c  in DIMACS:
-11258  11259  11260  0

c  3 does not represent an automaton state.
c    -(-b^{10, 75}_2 ∧  b^{10, 75}_1 ∧  b^{10, 75}_0 ∧ true) 
c  in CNF:
c     b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ false 
c  in DIMACS:
 11258 -11259 -11260  0
c  -3 does not represent an automaton state.
c    -( b^{10, 75}_2 ∧  b^{10, 75}_1 ∧  b^{10, 75}_0 ∧ true) 
c  in CNF:
c    -b^{10, 75}_2 ∨ -b^{10, 75}_1 ∨ -b^{10, 75}_0 ∨ false 
c  in DIMACS:
-11258 -11259 -11260  0

c i = 76
c  -2+1 --> -1
c    ( b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧  p_760) -> ( b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0)
c  in CNF:
c    -b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨  b^{10, 77}_2
c    -b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_1
c    -b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨  b^{10, 77}_0
c  in DIMACS:
-11261 -11262  11263 -760  11264 0
-11261 -11262  11263 -760 -11265 0
-11261 -11262  11263 -760  11266 0

c  -1+1 --> 0
c    ( b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0 ∧  p_760) -> (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧ -b^{10, 77}_0)
c  in CNF:
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_2
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_1
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_0
c  in DIMACS:
-11261  11262 -11263 -760 -11264 0
-11261  11262 -11263 -760 -11265 0
-11261  11262 -11263 -760 -11266 0

c  0+1 --> 1
c    (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧  p_760) -> (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0)
c  in CNF:
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_2
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_1
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨  b^{10, 77}_0
c  in DIMACS:
 11261  11262  11263 -760 -11264 0
 11261  11262  11263 -760 -11265 0
 11261  11262  11263 -760  11266 0

c  1+1 --> 2
c    (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0 ∧  p_760) -> (-b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0)
c  in CNF:
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_2
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨  b^{10, 77}_1
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ -p_760 ∨ -b^{10, 77}_0
c  in DIMACS:
 11261  11262 -11263 -760 -11264 0
 11261  11262 -11263 -760  11265 0
 11261  11262 -11263 -760 -11266 0

c  2+1 --> break 
c    (-b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧  p_760) -> break
c  in CNF:
c     b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 11261 -11262  11263 -760 1162 0


c  2-1 --> 1
c    (-b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧ -p_760) -> (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0)
c  in CNF:
c     b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_2
c     b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_1
c     b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨  b^{10, 77}_0
c  in DIMACS:
 11261 -11262  11263  760 -11264 0
 11261 -11262  11263  760 -11265 0
 11261 -11262  11263  760  11266 0

c  1-1 --> 0
c    (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0 ∧ -p_760) -> (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧ -b^{10, 77}_0)
c  in CNF:
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_2
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_1
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_0
c  in DIMACS:
 11261  11262 -11263  760 -11264 0
 11261  11262 -11263  760 -11265 0
 11261  11262 -11263  760 -11266 0

c  0-1 --> -1
c    (-b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧ -p_760) -> ( b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0)
c  in CNF:
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨  b^{10, 77}_2
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_1
c     b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨  b^{10, 77}_0
c  in DIMACS:
 11261  11262  11263  760  11264 0
 11261  11262  11263  760 -11265 0
 11261  11262  11263  760  11266 0

c  -1-1 --> -2
c    ( b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧  b^{10, 76}_0 ∧ -p_760) -> ( b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0)
c  in CNF:
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨  b^{10, 77}_2
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨  b^{10, 77}_1
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨  p_760 ∨ -b^{10, 77}_0
c  in DIMACS:
-11261  11262 -11263  760  11264 0
-11261  11262 -11263  760  11265 0
-11261  11262 -11263  760 -11266 0

c  -2-1 --> break 
c    ( b^{10, 76}_2 ∧  b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨  b^{10, 76}_0 ∨  p_760 ∨ break
c  in DIMACS:
-11261 -11262  11263  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 76}_2 ∧ -b^{10, 76}_1 ∧ -b^{10, 76}_0 ∧ true) 
c  in CNF:
c    -b^{10, 76}_2 ∨  b^{10, 76}_1 ∨  b^{10, 76}_0 ∨ false 
c  in DIMACS:
-11261  11262  11263  0

c  3 does not represent an automaton state.
c    -(-b^{10, 76}_2 ∧  b^{10, 76}_1 ∧  b^{10, 76}_0 ∧ true) 
c  in CNF:
c     b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ false 
c  in DIMACS:
 11261 -11262 -11263  0
c  -3 does not represent an automaton state.
c    -( b^{10, 76}_2 ∧  b^{10, 76}_1 ∧  b^{10, 76}_0 ∧ true) 
c  in CNF:
c    -b^{10, 76}_2 ∨ -b^{10, 76}_1 ∨ -b^{10, 76}_0 ∨ false 
c  in DIMACS:
-11261 -11262 -11263  0

c i = 77
c  -2+1 --> -1
c    ( b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧  p_770) -> ( b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0)
c  in CNF:
c    -b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨  b^{10, 78}_2
c    -b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_1
c    -b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨  b^{10, 78}_0
c  in DIMACS:
-11264 -11265  11266 -770  11267 0
-11264 -11265  11266 -770 -11268 0
-11264 -11265  11266 -770  11269 0

c  -1+1 --> 0
c    ( b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0 ∧  p_770) -> (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧ -b^{10, 78}_0)
c  in CNF:
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_2
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_1
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_0
c  in DIMACS:
-11264  11265 -11266 -770 -11267 0
-11264  11265 -11266 -770 -11268 0
-11264  11265 -11266 -770 -11269 0

c  0+1 --> 1
c    (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧  p_770) -> (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0)
c  in CNF:
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_2
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_1
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨  b^{10, 78}_0
c  in DIMACS:
 11264  11265  11266 -770 -11267 0
 11264  11265  11266 -770 -11268 0
 11264  11265  11266 -770  11269 0

c  1+1 --> 2
c    (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0 ∧  p_770) -> (-b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0)
c  in CNF:
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_2
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨  b^{10, 78}_1
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ -p_770 ∨ -b^{10, 78}_0
c  in DIMACS:
 11264  11265 -11266 -770 -11267 0
 11264  11265 -11266 -770  11268 0
 11264  11265 -11266 -770 -11269 0

c  2+1 --> break 
c    (-b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧  p_770) -> break
c  in CNF:
c     b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 11264 -11265  11266 -770 1162 0


c  2-1 --> 1
c    (-b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧ -p_770) -> (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0)
c  in CNF:
c     b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_2
c     b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_1
c     b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨  b^{10, 78}_0
c  in DIMACS:
 11264 -11265  11266  770 -11267 0
 11264 -11265  11266  770 -11268 0
 11264 -11265  11266  770  11269 0

c  1-1 --> 0
c    (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0 ∧ -p_770) -> (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧ -b^{10, 78}_0)
c  in CNF:
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_2
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_1
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_0
c  in DIMACS:
 11264  11265 -11266  770 -11267 0
 11264  11265 -11266  770 -11268 0
 11264  11265 -11266  770 -11269 0

c  0-1 --> -1
c    (-b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧ -p_770) -> ( b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0)
c  in CNF:
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨  b^{10, 78}_2
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_1
c     b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨  b^{10, 78}_0
c  in DIMACS:
 11264  11265  11266  770  11267 0
 11264  11265  11266  770 -11268 0
 11264  11265  11266  770  11269 0

c  -1-1 --> -2
c    ( b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧  b^{10, 77}_0 ∧ -p_770) -> ( b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0)
c  in CNF:
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨  b^{10, 78}_2
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨  b^{10, 78}_1
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨  p_770 ∨ -b^{10, 78}_0
c  in DIMACS:
-11264  11265 -11266  770  11267 0
-11264  11265 -11266  770  11268 0
-11264  11265 -11266  770 -11269 0

c  -2-1 --> break 
c    ( b^{10, 77}_2 ∧  b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨  b^{10, 77}_0 ∨  p_770 ∨ break
c  in DIMACS:
-11264 -11265  11266  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 77}_2 ∧ -b^{10, 77}_1 ∧ -b^{10, 77}_0 ∧ true) 
c  in CNF:
c    -b^{10, 77}_2 ∨  b^{10, 77}_1 ∨  b^{10, 77}_0 ∨ false 
c  in DIMACS:
-11264  11265  11266  0

c  3 does not represent an automaton state.
c    -(-b^{10, 77}_2 ∧  b^{10, 77}_1 ∧  b^{10, 77}_0 ∧ true) 
c  in CNF:
c     b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ false 
c  in DIMACS:
 11264 -11265 -11266  0
c  -3 does not represent an automaton state.
c    -( b^{10, 77}_2 ∧  b^{10, 77}_1 ∧  b^{10, 77}_0 ∧ true) 
c  in CNF:
c    -b^{10, 77}_2 ∨ -b^{10, 77}_1 ∨ -b^{10, 77}_0 ∨ false 
c  in DIMACS:
-11264 -11265 -11266  0

c i = 78
c  -2+1 --> -1
c    ( b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧  p_780) -> ( b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0)
c  in CNF:
c    -b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨  b^{10, 79}_2
c    -b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_1
c    -b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨  b^{10, 79}_0
c  in DIMACS:
-11267 -11268  11269 -780  11270 0
-11267 -11268  11269 -780 -11271 0
-11267 -11268  11269 -780  11272 0

c  -1+1 --> 0
c    ( b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0 ∧  p_780) -> (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧ -b^{10, 79}_0)
c  in CNF:
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_2
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_1
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_0
c  in DIMACS:
-11267  11268 -11269 -780 -11270 0
-11267  11268 -11269 -780 -11271 0
-11267  11268 -11269 -780 -11272 0

c  0+1 --> 1
c    (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧  p_780) -> (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0)
c  in CNF:
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_2
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_1
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨  b^{10, 79}_0
c  in DIMACS:
 11267  11268  11269 -780 -11270 0
 11267  11268  11269 -780 -11271 0
 11267  11268  11269 -780  11272 0

c  1+1 --> 2
c    (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0 ∧  p_780) -> (-b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0)
c  in CNF:
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_2
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨  b^{10, 79}_1
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ -p_780 ∨ -b^{10, 79}_0
c  in DIMACS:
 11267  11268 -11269 -780 -11270 0
 11267  11268 -11269 -780  11271 0
 11267  11268 -11269 -780 -11272 0

c  2+1 --> break 
c    (-b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧  p_780) -> break
c  in CNF:
c     b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 11267 -11268  11269 -780 1162 0


c  2-1 --> 1
c    (-b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧ -p_780) -> (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0)
c  in CNF:
c     b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_2
c     b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_1
c     b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨  b^{10, 79}_0
c  in DIMACS:
 11267 -11268  11269  780 -11270 0
 11267 -11268  11269  780 -11271 0
 11267 -11268  11269  780  11272 0

c  1-1 --> 0
c    (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0 ∧ -p_780) -> (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧ -b^{10, 79}_0)
c  in CNF:
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_2
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_1
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_0
c  in DIMACS:
 11267  11268 -11269  780 -11270 0
 11267  11268 -11269  780 -11271 0
 11267  11268 -11269  780 -11272 0

c  0-1 --> -1
c    (-b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧ -p_780) -> ( b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0)
c  in CNF:
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨  b^{10, 79}_2
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_1
c     b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨  b^{10, 79}_0
c  in DIMACS:
 11267  11268  11269  780  11270 0
 11267  11268  11269  780 -11271 0
 11267  11268  11269  780  11272 0

c  -1-1 --> -2
c    ( b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧  b^{10, 78}_0 ∧ -p_780) -> ( b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0)
c  in CNF:
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨  b^{10, 79}_2
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨  b^{10, 79}_1
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨  p_780 ∨ -b^{10, 79}_0
c  in DIMACS:
-11267  11268 -11269  780  11270 0
-11267  11268 -11269  780  11271 0
-11267  11268 -11269  780 -11272 0

c  -2-1 --> break 
c    ( b^{10, 78}_2 ∧  b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨  b^{10, 78}_0 ∨  p_780 ∨ break
c  in DIMACS:
-11267 -11268  11269  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 78}_2 ∧ -b^{10, 78}_1 ∧ -b^{10, 78}_0 ∧ true) 
c  in CNF:
c    -b^{10, 78}_2 ∨  b^{10, 78}_1 ∨  b^{10, 78}_0 ∨ false 
c  in DIMACS:
-11267  11268  11269  0

c  3 does not represent an automaton state.
c    -(-b^{10, 78}_2 ∧  b^{10, 78}_1 ∧  b^{10, 78}_0 ∧ true) 
c  in CNF:
c     b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ false 
c  in DIMACS:
 11267 -11268 -11269  0
c  -3 does not represent an automaton state.
c    -( b^{10, 78}_2 ∧  b^{10, 78}_1 ∧  b^{10, 78}_0 ∧ true) 
c  in CNF:
c    -b^{10, 78}_2 ∨ -b^{10, 78}_1 ∨ -b^{10, 78}_0 ∨ false 
c  in DIMACS:
-11267 -11268 -11269  0

c i = 79
c  -2+1 --> -1
c    ( b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧  p_790) -> ( b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0)
c  in CNF:
c    -b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨  b^{10, 80}_2
c    -b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_1
c    -b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨  b^{10, 80}_0
c  in DIMACS:
-11270 -11271  11272 -790  11273 0
-11270 -11271  11272 -790 -11274 0
-11270 -11271  11272 -790  11275 0

c  -1+1 --> 0
c    ( b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0 ∧  p_790) -> (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧ -b^{10, 80}_0)
c  in CNF:
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_2
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_1
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_0
c  in DIMACS:
-11270  11271 -11272 -790 -11273 0
-11270  11271 -11272 -790 -11274 0
-11270  11271 -11272 -790 -11275 0

c  0+1 --> 1
c    (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧  p_790) -> (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0)
c  in CNF:
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_2
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_1
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨  b^{10, 80}_0
c  in DIMACS:
 11270  11271  11272 -790 -11273 0
 11270  11271  11272 -790 -11274 0
 11270  11271  11272 -790  11275 0

c  1+1 --> 2
c    (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0 ∧  p_790) -> (-b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0)
c  in CNF:
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_2
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨  b^{10, 80}_1
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ -p_790 ∨ -b^{10, 80}_0
c  in DIMACS:
 11270  11271 -11272 -790 -11273 0
 11270  11271 -11272 -790  11274 0
 11270  11271 -11272 -790 -11275 0

c  2+1 --> break 
c    (-b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧  p_790) -> break
c  in CNF:
c     b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 11270 -11271  11272 -790 1162 0


c  2-1 --> 1
c    (-b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧ -p_790) -> (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0)
c  in CNF:
c     b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_2
c     b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_1
c     b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨  b^{10, 80}_0
c  in DIMACS:
 11270 -11271  11272  790 -11273 0
 11270 -11271  11272  790 -11274 0
 11270 -11271  11272  790  11275 0

c  1-1 --> 0
c    (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0 ∧ -p_790) -> (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧ -b^{10, 80}_0)
c  in CNF:
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_2
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_1
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_0
c  in DIMACS:
 11270  11271 -11272  790 -11273 0
 11270  11271 -11272  790 -11274 0
 11270  11271 -11272  790 -11275 0

c  0-1 --> -1
c    (-b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧ -p_790) -> ( b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0)
c  in CNF:
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨  b^{10, 80}_2
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_1
c     b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨  b^{10, 80}_0
c  in DIMACS:
 11270  11271  11272  790  11273 0
 11270  11271  11272  790 -11274 0
 11270  11271  11272  790  11275 0

c  -1-1 --> -2
c    ( b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧  b^{10, 79}_0 ∧ -p_790) -> ( b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0)
c  in CNF:
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨  b^{10, 80}_2
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨  b^{10, 80}_1
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨  p_790 ∨ -b^{10, 80}_0
c  in DIMACS:
-11270  11271 -11272  790  11273 0
-11270  11271 -11272  790  11274 0
-11270  11271 -11272  790 -11275 0

c  -2-1 --> break 
c    ( b^{10, 79}_2 ∧  b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨  b^{10, 79}_0 ∨  p_790 ∨ break
c  in DIMACS:
-11270 -11271  11272  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 79}_2 ∧ -b^{10, 79}_1 ∧ -b^{10, 79}_0 ∧ true) 
c  in CNF:
c    -b^{10, 79}_2 ∨  b^{10, 79}_1 ∨  b^{10, 79}_0 ∨ false 
c  in DIMACS:
-11270  11271  11272  0

c  3 does not represent an automaton state.
c    -(-b^{10, 79}_2 ∧  b^{10, 79}_1 ∧  b^{10, 79}_0 ∧ true) 
c  in CNF:
c     b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ false 
c  in DIMACS:
 11270 -11271 -11272  0
c  -3 does not represent an automaton state.
c    -( b^{10, 79}_2 ∧  b^{10, 79}_1 ∧  b^{10, 79}_0 ∧ true) 
c  in CNF:
c    -b^{10, 79}_2 ∨ -b^{10, 79}_1 ∨ -b^{10, 79}_0 ∨ false 
c  in DIMACS:
-11270 -11271 -11272  0

c i = 80
c  -2+1 --> -1
c    ( b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧  p_800) -> ( b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0)
c  in CNF:
c    -b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨  b^{10, 81}_2
c    -b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_1
c    -b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨  b^{10, 81}_0
c  in DIMACS:
-11273 -11274  11275 -800  11276 0
-11273 -11274  11275 -800 -11277 0
-11273 -11274  11275 -800  11278 0

c  -1+1 --> 0
c    ( b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0 ∧  p_800) -> (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧ -b^{10, 81}_0)
c  in CNF:
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_2
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_1
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_0
c  in DIMACS:
-11273  11274 -11275 -800 -11276 0
-11273  11274 -11275 -800 -11277 0
-11273  11274 -11275 -800 -11278 0

c  0+1 --> 1
c    (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧  p_800) -> (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0)
c  in CNF:
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_2
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_1
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨  b^{10, 81}_0
c  in DIMACS:
 11273  11274  11275 -800 -11276 0
 11273  11274  11275 -800 -11277 0
 11273  11274  11275 -800  11278 0

c  1+1 --> 2
c    (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0 ∧  p_800) -> (-b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0)
c  in CNF:
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_2
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨  b^{10, 81}_1
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ -p_800 ∨ -b^{10, 81}_0
c  in DIMACS:
 11273  11274 -11275 -800 -11276 0
 11273  11274 -11275 -800  11277 0
 11273  11274 -11275 -800 -11278 0

c  2+1 --> break 
c    (-b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧  p_800) -> break
c  in CNF:
c     b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 11273 -11274  11275 -800 1162 0


c  2-1 --> 1
c    (-b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧ -p_800) -> (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0)
c  in CNF:
c     b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_2
c     b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_1
c     b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨  b^{10, 81}_0
c  in DIMACS:
 11273 -11274  11275  800 -11276 0
 11273 -11274  11275  800 -11277 0
 11273 -11274  11275  800  11278 0

c  1-1 --> 0
c    (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0 ∧ -p_800) -> (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧ -b^{10, 81}_0)
c  in CNF:
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_2
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_1
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_0
c  in DIMACS:
 11273  11274 -11275  800 -11276 0
 11273  11274 -11275  800 -11277 0
 11273  11274 -11275  800 -11278 0

c  0-1 --> -1
c    (-b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧ -p_800) -> ( b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0)
c  in CNF:
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨  b^{10, 81}_2
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_1
c     b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨  b^{10, 81}_0
c  in DIMACS:
 11273  11274  11275  800  11276 0
 11273  11274  11275  800 -11277 0
 11273  11274  11275  800  11278 0

c  -1-1 --> -2
c    ( b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧  b^{10, 80}_0 ∧ -p_800) -> ( b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0)
c  in CNF:
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨  b^{10, 81}_2
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨  b^{10, 81}_1
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨  p_800 ∨ -b^{10, 81}_0
c  in DIMACS:
-11273  11274 -11275  800  11276 0
-11273  11274 -11275  800  11277 0
-11273  11274 -11275  800 -11278 0

c  -2-1 --> break 
c    ( b^{10, 80}_2 ∧  b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨  b^{10, 80}_0 ∨  p_800 ∨ break
c  in DIMACS:
-11273 -11274  11275  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 80}_2 ∧ -b^{10, 80}_1 ∧ -b^{10, 80}_0 ∧ true) 
c  in CNF:
c    -b^{10, 80}_2 ∨  b^{10, 80}_1 ∨  b^{10, 80}_0 ∨ false 
c  in DIMACS:
-11273  11274  11275  0

c  3 does not represent an automaton state.
c    -(-b^{10, 80}_2 ∧  b^{10, 80}_1 ∧  b^{10, 80}_0 ∧ true) 
c  in CNF:
c     b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ false 
c  in DIMACS:
 11273 -11274 -11275  0
c  -3 does not represent an automaton state.
c    -( b^{10, 80}_2 ∧  b^{10, 80}_1 ∧  b^{10, 80}_0 ∧ true) 
c  in CNF:
c    -b^{10, 80}_2 ∨ -b^{10, 80}_1 ∨ -b^{10, 80}_0 ∨ false 
c  in DIMACS:
-11273 -11274 -11275  0

c i = 81
c  -2+1 --> -1
c    ( b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧  p_810) -> ( b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0)
c  in CNF:
c    -b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨  b^{10, 82}_2
c    -b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_1
c    -b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨  b^{10, 82}_0
c  in DIMACS:
-11276 -11277  11278 -810  11279 0
-11276 -11277  11278 -810 -11280 0
-11276 -11277  11278 -810  11281 0

c  -1+1 --> 0
c    ( b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0 ∧  p_810) -> (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧ -b^{10, 82}_0)
c  in CNF:
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_2
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_1
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_0
c  in DIMACS:
-11276  11277 -11278 -810 -11279 0
-11276  11277 -11278 -810 -11280 0
-11276  11277 -11278 -810 -11281 0

c  0+1 --> 1
c    (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧  p_810) -> (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0)
c  in CNF:
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_2
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_1
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨  b^{10, 82}_0
c  in DIMACS:
 11276  11277  11278 -810 -11279 0
 11276  11277  11278 -810 -11280 0
 11276  11277  11278 -810  11281 0

c  1+1 --> 2
c    (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0 ∧  p_810) -> (-b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0)
c  in CNF:
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_2
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨  b^{10, 82}_1
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ -p_810 ∨ -b^{10, 82}_0
c  in DIMACS:
 11276  11277 -11278 -810 -11279 0
 11276  11277 -11278 -810  11280 0
 11276  11277 -11278 -810 -11281 0

c  2+1 --> break 
c    (-b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧  p_810) -> break
c  in CNF:
c     b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 11276 -11277  11278 -810 1162 0


c  2-1 --> 1
c    (-b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧ -p_810) -> (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0)
c  in CNF:
c     b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_2
c     b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_1
c     b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨  b^{10, 82}_0
c  in DIMACS:
 11276 -11277  11278  810 -11279 0
 11276 -11277  11278  810 -11280 0
 11276 -11277  11278  810  11281 0

c  1-1 --> 0
c    (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0 ∧ -p_810) -> (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧ -b^{10, 82}_0)
c  in CNF:
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_2
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_1
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_0
c  in DIMACS:
 11276  11277 -11278  810 -11279 0
 11276  11277 -11278  810 -11280 0
 11276  11277 -11278  810 -11281 0

c  0-1 --> -1
c    (-b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧ -p_810) -> ( b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0)
c  in CNF:
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨  b^{10, 82}_2
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_1
c     b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨  b^{10, 82}_0
c  in DIMACS:
 11276  11277  11278  810  11279 0
 11276  11277  11278  810 -11280 0
 11276  11277  11278  810  11281 0

c  -1-1 --> -2
c    ( b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧  b^{10, 81}_0 ∧ -p_810) -> ( b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0)
c  in CNF:
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨  b^{10, 82}_2
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨  b^{10, 82}_1
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨  p_810 ∨ -b^{10, 82}_0
c  in DIMACS:
-11276  11277 -11278  810  11279 0
-11276  11277 -11278  810  11280 0
-11276  11277 -11278  810 -11281 0

c  -2-1 --> break 
c    ( b^{10, 81}_2 ∧  b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨  b^{10, 81}_0 ∨  p_810 ∨ break
c  in DIMACS:
-11276 -11277  11278  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 81}_2 ∧ -b^{10, 81}_1 ∧ -b^{10, 81}_0 ∧ true) 
c  in CNF:
c    -b^{10, 81}_2 ∨  b^{10, 81}_1 ∨  b^{10, 81}_0 ∨ false 
c  in DIMACS:
-11276  11277  11278  0

c  3 does not represent an automaton state.
c    -(-b^{10, 81}_2 ∧  b^{10, 81}_1 ∧  b^{10, 81}_0 ∧ true) 
c  in CNF:
c     b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ false 
c  in DIMACS:
 11276 -11277 -11278  0
c  -3 does not represent an automaton state.
c    -( b^{10, 81}_2 ∧  b^{10, 81}_1 ∧  b^{10, 81}_0 ∧ true) 
c  in CNF:
c    -b^{10, 81}_2 ∨ -b^{10, 81}_1 ∨ -b^{10, 81}_0 ∨ false 
c  in DIMACS:
-11276 -11277 -11278  0

c i = 82
c  -2+1 --> -1
c    ( b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧  p_820) -> ( b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0)
c  in CNF:
c    -b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨  b^{10, 83}_2
c    -b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_1
c    -b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨  b^{10, 83}_0
c  in DIMACS:
-11279 -11280  11281 -820  11282 0
-11279 -11280  11281 -820 -11283 0
-11279 -11280  11281 -820  11284 0

c  -1+1 --> 0
c    ( b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0 ∧  p_820) -> (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧ -b^{10, 83}_0)
c  in CNF:
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_2
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_1
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_0
c  in DIMACS:
-11279  11280 -11281 -820 -11282 0
-11279  11280 -11281 -820 -11283 0
-11279  11280 -11281 -820 -11284 0

c  0+1 --> 1
c    (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧  p_820) -> (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0)
c  in CNF:
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_2
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_1
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨  b^{10, 83}_0
c  in DIMACS:
 11279  11280  11281 -820 -11282 0
 11279  11280  11281 -820 -11283 0
 11279  11280  11281 -820  11284 0

c  1+1 --> 2
c    (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0 ∧  p_820) -> (-b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0)
c  in CNF:
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_2
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨  b^{10, 83}_1
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ -p_820 ∨ -b^{10, 83}_0
c  in DIMACS:
 11279  11280 -11281 -820 -11282 0
 11279  11280 -11281 -820  11283 0
 11279  11280 -11281 -820 -11284 0

c  2+1 --> break 
c    (-b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧  p_820) -> break
c  in CNF:
c     b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 11279 -11280  11281 -820 1162 0


c  2-1 --> 1
c    (-b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧ -p_820) -> (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0)
c  in CNF:
c     b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_2
c     b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_1
c     b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨  b^{10, 83}_0
c  in DIMACS:
 11279 -11280  11281  820 -11282 0
 11279 -11280  11281  820 -11283 0
 11279 -11280  11281  820  11284 0

c  1-1 --> 0
c    (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0 ∧ -p_820) -> (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧ -b^{10, 83}_0)
c  in CNF:
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_2
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_1
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_0
c  in DIMACS:
 11279  11280 -11281  820 -11282 0
 11279  11280 -11281  820 -11283 0
 11279  11280 -11281  820 -11284 0

c  0-1 --> -1
c    (-b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧ -p_820) -> ( b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0)
c  in CNF:
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨  b^{10, 83}_2
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_1
c     b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨  b^{10, 83}_0
c  in DIMACS:
 11279  11280  11281  820  11282 0
 11279  11280  11281  820 -11283 0
 11279  11280  11281  820  11284 0

c  -1-1 --> -2
c    ( b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧  b^{10, 82}_0 ∧ -p_820) -> ( b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0)
c  in CNF:
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨  b^{10, 83}_2
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨  b^{10, 83}_1
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨  p_820 ∨ -b^{10, 83}_0
c  in DIMACS:
-11279  11280 -11281  820  11282 0
-11279  11280 -11281  820  11283 0
-11279  11280 -11281  820 -11284 0

c  -2-1 --> break 
c    ( b^{10, 82}_2 ∧  b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨  b^{10, 82}_0 ∨  p_820 ∨ break
c  in DIMACS:
-11279 -11280  11281  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 82}_2 ∧ -b^{10, 82}_1 ∧ -b^{10, 82}_0 ∧ true) 
c  in CNF:
c    -b^{10, 82}_2 ∨  b^{10, 82}_1 ∨  b^{10, 82}_0 ∨ false 
c  in DIMACS:
-11279  11280  11281  0

c  3 does not represent an automaton state.
c    -(-b^{10, 82}_2 ∧  b^{10, 82}_1 ∧  b^{10, 82}_0 ∧ true) 
c  in CNF:
c     b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ false 
c  in DIMACS:
 11279 -11280 -11281  0
c  -3 does not represent an automaton state.
c    -( b^{10, 82}_2 ∧  b^{10, 82}_1 ∧  b^{10, 82}_0 ∧ true) 
c  in CNF:
c    -b^{10, 82}_2 ∨ -b^{10, 82}_1 ∨ -b^{10, 82}_0 ∨ false 
c  in DIMACS:
-11279 -11280 -11281  0

c i = 83
c  -2+1 --> -1
c    ( b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧  p_830) -> ( b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0)
c  in CNF:
c    -b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨  b^{10, 84}_2
c    -b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_1
c    -b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨  b^{10, 84}_0
c  in DIMACS:
-11282 -11283  11284 -830  11285 0
-11282 -11283  11284 -830 -11286 0
-11282 -11283  11284 -830  11287 0

c  -1+1 --> 0
c    ( b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0 ∧  p_830) -> (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧ -b^{10, 84}_0)
c  in CNF:
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_2
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_1
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_0
c  in DIMACS:
-11282  11283 -11284 -830 -11285 0
-11282  11283 -11284 -830 -11286 0
-11282  11283 -11284 -830 -11287 0

c  0+1 --> 1
c    (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧  p_830) -> (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0)
c  in CNF:
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_2
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_1
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨  b^{10, 84}_0
c  in DIMACS:
 11282  11283  11284 -830 -11285 0
 11282  11283  11284 -830 -11286 0
 11282  11283  11284 -830  11287 0

c  1+1 --> 2
c    (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0 ∧  p_830) -> (-b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0)
c  in CNF:
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_2
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨  b^{10, 84}_1
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ -p_830 ∨ -b^{10, 84}_0
c  in DIMACS:
 11282  11283 -11284 -830 -11285 0
 11282  11283 -11284 -830  11286 0
 11282  11283 -11284 -830 -11287 0

c  2+1 --> break 
c    (-b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧  p_830) -> break
c  in CNF:
c     b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 11282 -11283  11284 -830 1162 0


c  2-1 --> 1
c    (-b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧ -p_830) -> (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0)
c  in CNF:
c     b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_2
c     b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_1
c     b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨  b^{10, 84}_0
c  in DIMACS:
 11282 -11283  11284  830 -11285 0
 11282 -11283  11284  830 -11286 0
 11282 -11283  11284  830  11287 0

c  1-1 --> 0
c    (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0 ∧ -p_830) -> (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧ -b^{10, 84}_0)
c  in CNF:
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_2
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_1
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_0
c  in DIMACS:
 11282  11283 -11284  830 -11285 0
 11282  11283 -11284  830 -11286 0
 11282  11283 -11284  830 -11287 0

c  0-1 --> -1
c    (-b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧ -p_830) -> ( b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0)
c  in CNF:
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨  b^{10, 84}_2
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_1
c     b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨  b^{10, 84}_0
c  in DIMACS:
 11282  11283  11284  830  11285 0
 11282  11283  11284  830 -11286 0
 11282  11283  11284  830  11287 0

c  -1-1 --> -2
c    ( b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧  b^{10, 83}_0 ∧ -p_830) -> ( b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0)
c  in CNF:
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨  b^{10, 84}_2
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨  b^{10, 84}_1
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨  p_830 ∨ -b^{10, 84}_0
c  in DIMACS:
-11282  11283 -11284  830  11285 0
-11282  11283 -11284  830  11286 0
-11282  11283 -11284  830 -11287 0

c  -2-1 --> break 
c    ( b^{10, 83}_2 ∧  b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨  b^{10, 83}_0 ∨  p_830 ∨ break
c  in DIMACS:
-11282 -11283  11284  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 83}_2 ∧ -b^{10, 83}_1 ∧ -b^{10, 83}_0 ∧ true) 
c  in CNF:
c    -b^{10, 83}_2 ∨  b^{10, 83}_1 ∨  b^{10, 83}_0 ∨ false 
c  in DIMACS:
-11282  11283  11284  0

c  3 does not represent an automaton state.
c    -(-b^{10, 83}_2 ∧  b^{10, 83}_1 ∧  b^{10, 83}_0 ∧ true) 
c  in CNF:
c     b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ false 
c  in DIMACS:
 11282 -11283 -11284  0
c  -3 does not represent an automaton state.
c    -( b^{10, 83}_2 ∧  b^{10, 83}_1 ∧  b^{10, 83}_0 ∧ true) 
c  in CNF:
c    -b^{10, 83}_2 ∨ -b^{10, 83}_1 ∨ -b^{10, 83}_0 ∨ false 
c  in DIMACS:
-11282 -11283 -11284  0

c i = 84
c  -2+1 --> -1
c    ( b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧  p_840) -> ( b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0)
c  in CNF:
c    -b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨  b^{10, 85}_2
c    -b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_1
c    -b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨  b^{10, 85}_0
c  in DIMACS:
-11285 -11286  11287 -840  11288 0
-11285 -11286  11287 -840 -11289 0
-11285 -11286  11287 -840  11290 0

c  -1+1 --> 0
c    ( b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0 ∧  p_840) -> (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧ -b^{10, 85}_0)
c  in CNF:
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_2
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_1
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_0
c  in DIMACS:
-11285  11286 -11287 -840 -11288 0
-11285  11286 -11287 -840 -11289 0
-11285  11286 -11287 -840 -11290 0

c  0+1 --> 1
c    (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧  p_840) -> (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0)
c  in CNF:
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_2
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_1
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨  b^{10, 85}_0
c  in DIMACS:
 11285  11286  11287 -840 -11288 0
 11285  11286  11287 -840 -11289 0
 11285  11286  11287 -840  11290 0

c  1+1 --> 2
c    (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0 ∧  p_840) -> (-b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0)
c  in CNF:
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_2
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨  b^{10, 85}_1
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ -p_840 ∨ -b^{10, 85}_0
c  in DIMACS:
 11285  11286 -11287 -840 -11288 0
 11285  11286 -11287 -840  11289 0
 11285  11286 -11287 -840 -11290 0

c  2+1 --> break 
c    (-b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧  p_840) -> break
c  in CNF:
c     b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 11285 -11286  11287 -840 1162 0


c  2-1 --> 1
c    (-b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧ -p_840) -> (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0)
c  in CNF:
c     b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_2
c     b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_1
c     b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨  b^{10, 85}_0
c  in DIMACS:
 11285 -11286  11287  840 -11288 0
 11285 -11286  11287  840 -11289 0
 11285 -11286  11287  840  11290 0

c  1-1 --> 0
c    (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0 ∧ -p_840) -> (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧ -b^{10, 85}_0)
c  in CNF:
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_2
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_1
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_0
c  in DIMACS:
 11285  11286 -11287  840 -11288 0
 11285  11286 -11287  840 -11289 0
 11285  11286 -11287  840 -11290 0

c  0-1 --> -1
c    (-b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧ -p_840) -> ( b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0)
c  in CNF:
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨  b^{10, 85}_2
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_1
c     b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨  b^{10, 85}_0
c  in DIMACS:
 11285  11286  11287  840  11288 0
 11285  11286  11287  840 -11289 0
 11285  11286  11287  840  11290 0

c  -1-1 --> -2
c    ( b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧  b^{10, 84}_0 ∧ -p_840) -> ( b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0)
c  in CNF:
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨  b^{10, 85}_2
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨  b^{10, 85}_1
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨  p_840 ∨ -b^{10, 85}_0
c  in DIMACS:
-11285  11286 -11287  840  11288 0
-11285  11286 -11287  840  11289 0
-11285  11286 -11287  840 -11290 0

c  -2-1 --> break 
c    ( b^{10, 84}_2 ∧  b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨  b^{10, 84}_0 ∨  p_840 ∨ break
c  in DIMACS:
-11285 -11286  11287  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 84}_2 ∧ -b^{10, 84}_1 ∧ -b^{10, 84}_0 ∧ true) 
c  in CNF:
c    -b^{10, 84}_2 ∨  b^{10, 84}_1 ∨  b^{10, 84}_0 ∨ false 
c  in DIMACS:
-11285  11286  11287  0

c  3 does not represent an automaton state.
c    -(-b^{10, 84}_2 ∧  b^{10, 84}_1 ∧  b^{10, 84}_0 ∧ true) 
c  in CNF:
c     b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ false 
c  in DIMACS:
 11285 -11286 -11287  0
c  -3 does not represent an automaton state.
c    -( b^{10, 84}_2 ∧  b^{10, 84}_1 ∧  b^{10, 84}_0 ∧ true) 
c  in CNF:
c    -b^{10, 84}_2 ∨ -b^{10, 84}_1 ∨ -b^{10, 84}_0 ∨ false 
c  in DIMACS:
-11285 -11286 -11287  0

c i = 85
c  -2+1 --> -1
c    ( b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧  p_850) -> ( b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0)
c  in CNF:
c    -b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨  b^{10, 86}_2
c    -b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_1
c    -b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨  b^{10, 86}_0
c  in DIMACS:
-11288 -11289  11290 -850  11291 0
-11288 -11289  11290 -850 -11292 0
-11288 -11289  11290 -850  11293 0

c  -1+1 --> 0
c    ( b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0 ∧  p_850) -> (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧ -b^{10, 86}_0)
c  in CNF:
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_2
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_1
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_0
c  in DIMACS:
-11288  11289 -11290 -850 -11291 0
-11288  11289 -11290 -850 -11292 0
-11288  11289 -11290 -850 -11293 0

c  0+1 --> 1
c    (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧  p_850) -> (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0)
c  in CNF:
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_2
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_1
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨  b^{10, 86}_0
c  in DIMACS:
 11288  11289  11290 -850 -11291 0
 11288  11289  11290 -850 -11292 0
 11288  11289  11290 -850  11293 0

c  1+1 --> 2
c    (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0 ∧  p_850) -> (-b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0)
c  in CNF:
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_2
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨  b^{10, 86}_1
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ -p_850 ∨ -b^{10, 86}_0
c  in DIMACS:
 11288  11289 -11290 -850 -11291 0
 11288  11289 -11290 -850  11292 0
 11288  11289 -11290 -850 -11293 0

c  2+1 --> break 
c    (-b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧  p_850) -> break
c  in CNF:
c     b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 11288 -11289  11290 -850 1162 0


c  2-1 --> 1
c    (-b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧ -p_850) -> (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0)
c  in CNF:
c     b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_2
c     b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_1
c     b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨  b^{10, 86}_0
c  in DIMACS:
 11288 -11289  11290  850 -11291 0
 11288 -11289  11290  850 -11292 0
 11288 -11289  11290  850  11293 0

c  1-1 --> 0
c    (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0 ∧ -p_850) -> (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧ -b^{10, 86}_0)
c  in CNF:
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_2
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_1
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_0
c  in DIMACS:
 11288  11289 -11290  850 -11291 0
 11288  11289 -11290  850 -11292 0
 11288  11289 -11290  850 -11293 0

c  0-1 --> -1
c    (-b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧ -p_850) -> ( b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0)
c  in CNF:
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨  b^{10, 86}_2
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_1
c     b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨  b^{10, 86}_0
c  in DIMACS:
 11288  11289  11290  850  11291 0
 11288  11289  11290  850 -11292 0
 11288  11289  11290  850  11293 0

c  -1-1 --> -2
c    ( b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧  b^{10, 85}_0 ∧ -p_850) -> ( b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0)
c  in CNF:
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨  b^{10, 86}_2
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨  b^{10, 86}_1
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨  p_850 ∨ -b^{10, 86}_0
c  in DIMACS:
-11288  11289 -11290  850  11291 0
-11288  11289 -11290  850  11292 0
-11288  11289 -11290  850 -11293 0

c  -2-1 --> break 
c    ( b^{10, 85}_2 ∧  b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨  b^{10, 85}_0 ∨  p_850 ∨ break
c  in DIMACS:
-11288 -11289  11290  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 85}_2 ∧ -b^{10, 85}_1 ∧ -b^{10, 85}_0 ∧ true) 
c  in CNF:
c    -b^{10, 85}_2 ∨  b^{10, 85}_1 ∨  b^{10, 85}_0 ∨ false 
c  in DIMACS:
-11288  11289  11290  0

c  3 does not represent an automaton state.
c    -(-b^{10, 85}_2 ∧  b^{10, 85}_1 ∧  b^{10, 85}_0 ∧ true) 
c  in CNF:
c     b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ false 
c  in DIMACS:
 11288 -11289 -11290  0
c  -3 does not represent an automaton state.
c    -( b^{10, 85}_2 ∧  b^{10, 85}_1 ∧  b^{10, 85}_0 ∧ true) 
c  in CNF:
c    -b^{10, 85}_2 ∨ -b^{10, 85}_1 ∨ -b^{10, 85}_0 ∨ false 
c  in DIMACS:
-11288 -11289 -11290  0

c i = 86
c  -2+1 --> -1
c    ( b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧  p_860) -> ( b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0)
c  in CNF:
c    -b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨  b^{10, 87}_2
c    -b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_1
c    -b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨  b^{10, 87}_0
c  in DIMACS:
-11291 -11292  11293 -860  11294 0
-11291 -11292  11293 -860 -11295 0
-11291 -11292  11293 -860  11296 0

c  -1+1 --> 0
c    ( b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0 ∧  p_860) -> (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧ -b^{10, 87}_0)
c  in CNF:
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_2
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_1
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_0
c  in DIMACS:
-11291  11292 -11293 -860 -11294 0
-11291  11292 -11293 -860 -11295 0
-11291  11292 -11293 -860 -11296 0

c  0+1 --> 1
c    (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧  p_860) -> (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0)
c  in CNF:
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_2
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_1
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨  b^{10, 87}_0
c  in DIMACS:
 11291  11292  11293 -860 -11294 0
 11291  11292  11293 -860 -11295 0
 11291  11292  11293 -860  11296 0

c  1+1 --> 2
c    (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0 ∧  p_860) -> (-b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0)
c  in CNF:
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_2
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨  b^{10, 87}_1
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ -p_860 ∨ -b^{10, 87}_0
c  in DIMACS:
 11291  11292 -11293 -860 -11294 0
 11291  11292 -11293 -860  11295 0
 11291  11292 -11293 -860 -11296 0

c  2+1 --> break 
c    (-b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧  p_860) -> break
c  in CNF:
c     b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 11291 -11292  11293 -860 1162 0


c  2-1 --> 1
c    (-b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧ -p_860) -> (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0)
c  in CNF:
c     b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_2
c     b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_1
c     b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨  b^{10, 87}_0
c  in DIMACS:
 11291 -11292  11293  860 -11294 0
 11291 -11292  11293  860 -11295 0
 11291 -11292  11293  860  11296 0

c  1-1 --> 0
c    (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0 ∧ -p_860) -> (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧ -b^{10, 87}_0)
c  in CNF:
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_2
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_1
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_0
c  in DIMACS:
 11291  11292 -11293  860 -11294 0
 11291  11292 -11293  860 -11295 0
 11291  11292 -11293  860 -11296 0

c  0-1 --> -1
c    (-b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧ -p_860) -> ( b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0)
c  in CNF:
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨  b^{10, 87}_2
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_1
c     b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨  b^{10, 87}_0
c  in DIMACS:
 11291  11292  11293  860  11294 0
 11291  11292  11293  860 -11295 0
 11291  11292  11293  860  11296 0

c  -1-1 --> -2
c    ( b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧  b^{10, 86}_0 ∧ -p_860) -> ( b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0)
c  in CNF:
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨  b^{10, 87}_2
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨  b^{10, 87}_1
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨  p_860 ∨ -b^{10, 87}_0
c  in DIMACS:
-11291  11292 -11293  860  11294 0
-11291  11292 -11293  860  11295 0
-11291  11292 -11293  860 -11296 0

c  -2-1 --> break 
c    ( b^{10, 86}_2 ∧  b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨  b^{10, 86}_0 ∨  p_860 ∨ break
c  in DIMACS:
-11291 -11292  11293  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 86}_2 ∧ -b^{10, 86}_1 ∧ -b^{10, 86}_0 ∧ true) 
c  in CNF:
c    -b^{10, 86}_2 ∨  b^{10, 86}_1 ∨  b^{10, 86}_0 ∨ false 
c  in DIMACS:
-11291  11292  11293  0

c  3 does not represent an automaton state.
c    -(-b^{10, 86}_2 ∧  b^{10, 86}_1 ∧  b^{10, 86}_0 ∧ true) 
c  in CNF:
c     b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ false 
c  in DIMACS:
 11291 -11292 -11293  0
c  -3 does not represent an automaton state.
c    -( b^{10, 86}_2 ∧  b^{10, 86}_1 ∧  b^{10, 86}_0 ∧ true) 
c  in CNF:
c    -b^{10, 86}_2 ∨ -b^{10, 86}_1 ∨ -b^{10, 86}_0 ∨ false 
c  in DIMACS:
-11291 -11292 -11293  0

c i = 87
c  -2+1 --> -1
c    ( b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧  p_870) -> ( b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0)
c  in CNF:
c    -b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨  b^{10, 88}_2
c    -b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_1
c    -b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨  b^{10, 88}_0
c  in DIMACS:
-11294 -11295  11296 -870  11297 0
-11294 -11295  11296 -870 -11298 0
-11294 -11295  11296 -870  11299 0

c  -1+1 --> 0
c    ( b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0 ∧  p_870) -> (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧ -b^{10, 88}_0)
c  in CNF:
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_2
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_1
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_0
c  in DIMACS:
-11294  11295 -11296 -870 -11297 0
-11294  11295 -11296 -870 -11298 0
-11294  11295 -11296 -870 -11299 0

c  0+1 --> 1
c    (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧  p_870) -> (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0)
c  in CNF:
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_2
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_1
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨  b^{10, 88}_0
c  in DIMACS:
 11294  11295  11296 -870 -11297 0
 11294  11295  11296 -870 -11298 0
 11294  11295  11296 -870  11299 0

c  1+1 --> 2
c    (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0 ∧  p_870) -> (-b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0)
c  in CNF:
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_2
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨  b^{10, 88}_1
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ -p_870 ∨ -b^{10, 88}_0
c  in DIMACS:
 11294  11295 -11296 -870 -11297 0
 11294  11295 -11296 -870  11298 0
 11294  11295 -11296 -870 -11299 0

c  2+1 --> break 
c    (-b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧  p_870) -> break
c  in CNF:
c     b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 11294 -11295  11296 -870 1162 0


c  2-1 --> 1
c    (-b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧ -p_870) -> (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0)
c  in CNF:
c     b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_2
c     b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_1
c     b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨  b^{10, 88}_0
c  in DIMACS:
 11294 -11295  11296  870 -11297 0
 11294 -11295  11296  870 -11298 0
 11294 -11295  11296  870  11299 0

c  1-1 --> 0
c    (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0 ∧ -p_870) -> (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧ -b^{10, 88}_0)
c  in CNF:
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_2
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_1
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_0
c  in DIMACS:
 11294  11295 -11296  870 -11297 0
 11294  11295 -11296  870 -11298 0
 11294  11295 -11296  870 -11299 0

c  0-1 --> -1
c    (-b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧ -p_870) -> ( b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0)
c  in CNF:
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨  b^{10, 88}_2
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_1
c     b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨  b^{10, 88}_0
c  in DIMACS:
 11294  11295  11296  870  11297 0
 11294  11295  11296  870 -11298 0
 11294  11295  11296  870  11299 0

c  -1-1 --> -2
c    ( b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧  b^{10, 87}_0 ∧ -p_870) -> ( b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0)
c  in CNF:
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨  b^{10, 88}_2
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨  b^{10, 88}_1
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨  p_870 ∨ -b^{10, 88}_0
c  in DIMACS:
-11294  11295 -11296  870  11297 0
-11294  11295 -11296  870  11298 0
-11294  11295 -11296  870 -11299 0

c  -2-1 --> break 
c    ( b^{10, 87}_2 ∧  b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨  b^{10, 87}_0 ∨  p_870 ∨ break
c  in DIMACS:
-11294 -11295  11296  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 87}_2 ∧ -b^{10, 87}_1 ∧ -b^{10, 87}_0 ∧ true) 
c  in CNF:
c    -b^{10, 87}_2 ∨  b^{10, 87}_1 ∨  b^{10, 87}_0 ∨ false 
c  in DIMACS:
-11294  11295  11296  0

c  3 does not represent an automaton state.
c    -(-b^{10, 87}_2 ∧  b^{10, 87}_1 ∧  b^{10, 87}_0 ∧ true) 
c  in CNF:
c     b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ false 
c  in DIMACS:
 11294 -11295 -11296  0
c  -3 does not represent an automaton state.
c    -( b^{10, 87}_2 ∧  b^{10, 87}_1 ∧  b^{10, 87}_0 ∧ true) 
c  in CNF:
c    -b^{10, 87}_2 ∨ -b^{10, 87}_1 ∨ -b^{10, 87}_0 ∨ false 
c  in DIMACS:
-11294 -11295 -11296  0

c i = 88
c  -2+1 --> -1
c    ( b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧  p_880) -> ( b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0)
c  in CNF:
c    -b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨  b^{10, 89}_2
c    -b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_1
c    -b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨  b^{10, 89}_0
c  in DIMACS:
-11297 -11298  11299 -880  11300 0
-11297 -11298  11299 -880 -11301 0
-11297 -11298  11299 -880  11302 0

c  -1+1 --> 0
c    ( b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0 ∧  p_880) -> (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧ -b^{10, 89}_0)
c  in CNF:
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_2
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_1
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_0
c  in DIMACS:
-11297  11298 -11299 -880 -11300 0
-11297  11298 -11299 -880 -11301 0
-11297  11298 -11299 -880 -11302 0

c  0+1 --> 1
c    (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧  p_880) -> (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0)
c  in CNF:
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_2
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_1
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨  b^{10, 89}_0
c  in DIMACS:
 11297  11298  11299 -880 -11300 0
 11297  11298  11299 -880 -11301 0
 11297  11298  11299 -880  11302 0

c  1+1 --> 2
c    (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0 ∧  p_880) -> (-b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0)
c  in CNF:
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_2
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨  b^{10, 89}_1
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ -p_880 ∨ -b^{10, 89}_0
c  in DIMACS:
 11297  11298 -11299 -880 -11300 0
 11297  11298 -11299 -880  11301 0
 11297  11298 -11299 -880 -11302 0

c  2+1 --> break 
c    (-b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧  p_880) -> break
c  in CNF:
c     b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 11297 -11298  11299 -880 1162 0


c  2-1 --> 1
c    (-b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧ -p_880) -> (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0)
c  in CNF:
c     b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_2
c     b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_1
c     b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨  b^{10, 89}_0
c  in DIMACS:
 11297 -11298  11299  880 -11300 0
 11297 -11298  11299  880 -11301 0
 11297 -11298  11299  880  11302 0

c  1-1 --> 0
c    (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0 ∧ -p_880) -> (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧ -b^{10, 89}_0)
c  in CNF:
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_2
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_1
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_0
c  in DIMACS:
 11297  11298 -11299  880 -11300 0
 11297  11298 -11299  880 -11301 0
 11297  11298 -11299  880 -11302 0

c  0-1 --> -1
c    (-b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧ -p_880) -> ( b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0)
c  in CNF:
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨  b^{10, 89}_2
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_1
c     b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨  b^{10, 89}_0
c  in DIMACS:
 11297  11298  11299  880  11300 0
 11297  11298  11299  880 -11301 0
 11297  11298  11299  880  11302 0

c  -1-1 --> -2
c    ( b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧  b^{10, 88}_0 ∧ -p_880) -> ( b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0)
c  in CNF:
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨  b^{10, 89}_2
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨  b^{10, 89}_1
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨  p_880 ∨ -b^{10, 89}_0
c  in DIMACS:
-11297  11298 -11299  880  11300 0
-11297  11298 -11299  880  11301 0
-11297  11298 -11299  880 -11302 0

c  -2-1 --> break 
c    ( b^{10, 88}_2 ∧  b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨  b^{10, 88}_0 ∨  p_880 ∨ break
c  in DIMACS:
-11297 -11298  11299  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 88}_2 ∧ -b^{10, 88}_1 ∧ -b^{10, 88}_0 ∧ true) 
c  in CNF:
c    -b^{10, 88}_2 ∨  b^{10, 88}_1 ∨  b^{10, 88}_0 ∨ false 
c  in DIMACS:
-11297  11298  11299  0

c  3 does not represent an automaton state.
c    -(-b^{10, 88}_2 ∧  b^{10, 88}_1 ∧  b^{10, 88}_0 ∧ true) 
c  in CNF:
c     b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ false 
c  in DIMACS:
 11297 -11298 -11299  0
c  -3 does not represent an automaton state.
c    -( b^{10, 88}_2 ∧  b^{10, 88}_1 ∧  b^{10, 88}_0 ∧ true) 
c  in CNF:
c    -b^{10, 88}_2 ∨ -b^{10, 88}_1 ∨ -b^{10, 88}_0 ∨ false 
c  in DIMACS:
-11297 -11298 -11299  0

c i = 89
c  -2+1 --> -1
c    ( b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧  p_890) -> ( b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0)
c  in CNF:
c    -b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨  b^{10, 90}_2
c    -b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_1
c    -b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨  b^{10, 90}_0
c  in DIMACS:
-11300 -11301  11302 -890  11303 0
-11300 -11301  11302 -890 -11304 0
-11300 -11301  11302 -890  11305 0

c  -1+1 --> 0
c    ( b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0 ∧  p_890) -> (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧ -b^{10, 90}_0)
c  in CNF:
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_2
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_1
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_0
c  in DIMACS:
-11300  11301 -11302 -890 -11303 0
-11300  11301 -11302 -890 -11304 0
-11300  11301 -11302 -890 -11305 0

c  0+1 --> 1
c    (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧  p_890) -> (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0)
c  in CNF:
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_2
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_1
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨  b^{10, 90}_0
c  in DIMACS:
 11300  11301  11302 -890 -11303 0
 11300  11301  11302 -890 -11304 0
 11300  11301  11302 -890  11305 0

c  1+1 --> 2
c    (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0 ∧  p_890) -> (-b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0)
c  in CNF:
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_2
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨  b^{10, 90}_1
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ -p_890 ∨ -b^{10, 90}_0
c  in DIMACS:
 11300  11301 -11302 -890 -11303 0
 11300  11301 -11302 -890  11304 0
 11300  11301 -11302 -890 -11305 0

c  2+1 --> break 
c    (-b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧  p_890) -> break
c  in CNF:
c     b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 11300 -11301  11302 -890 1162 0


c  2-1 --> 1
c    (-b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧ -p_890) -> (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0)
c  in CNF:
c     b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_2
c     b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_1
c     b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨  b^{10, 90}_0
c  in DIMACS:
 11300 -11301  11302  890 -11303 0
 11300 -11301  11302  890 -11304 0
 11300 -11301  11302  890  11305 0

c  1-1 --> 0
c    (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0 ∧ -p_890) -> (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧ -b^{10, 90}_0)
c  in CNF:
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_2
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_1
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_0
c  in DIMACS:
 11300  11301 -11302  890 -11303 0
 11300  11301 -11302  890 -11304 0
 11300  11301 -11302  890 -11305 0

c  0-1 --> -1
c    (-b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧ -p_890) -> ( b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0)
c  in CNF:
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨  b^{10, 90}_2
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_1
c     b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨  b^{10, 90}_0
c  in DIMACS:
 11300  11301  11302  890  11303 0
 11300  11301  11302  890 -11304 0
 11300  11301  11302  890  11305 0

c  -1-1 --> -2
c    ( b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧  b^{10, 89}_0 ∧ -p_890) -> ( b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0)
c  in CNF:
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨  b^{10, 90}_2
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨  b^{10, 90}_1
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨  p_890 ∨ -b^{10, 90}_0
c  in DIMACS:
-11300  11301 -11302  890  11303 0
-11300  11301 -11302  890  11304 0
-11300  11301 -11302  890 -11305 0

c  -2-1 --> break 
c    ( b^{10, 89}_2 ∧  b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨  b^{10, 89}_0 ∨  p_890 ∨ break
c  in DIMACS:
-11300 -11301  11302  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 89}_2 ∧ -b^{10, 89}_1 ∧ -b^{10, 89}_0 ∧ true) 
c  in CNF:
c    -b^{10, 89}_2 ∨  b^{10, 89}_1 ∨  b^{10, 89}_0 ∨ false 
c  in DIMACS:
-11300  11301  11302  0

c  3 does not represent an automaton state.
c    -(-b^{10, 89}_2 ∧  b^{10, 89}_1 ∧  b^{10, 89}_0 ∧ true) 
c  in CNF:
c     b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ false 
c  in DIMACS:
 11300 -11301 -11302  0
c  -3 does not represent an automaton state.
c    -( b^{10, 89}_2 ∧  b^{10, 89}_1 ∧  b^{10, 89}_0 ∧ true) 
c  in CNF:
c    -b^{10, 89}_2 ∨ -b^{10, 89}_1 ∨ -b^{10, 89}_0 ∨ false 
c  in DIMACS:
-11300 -11301 -11302  0

c i = 90
c  -2+1 --> -1
c    ( b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧  p_900) -> ( b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0)
c  in CNF:
c    -b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨  b^{10, 91}_2
c    -b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_1
c    -b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨  b^{10, 91}_0
c  in DIMACS:
-11303 -11304  11305 -900  11306 0
-11303 -11304  11305 -900 -11307 0
-11303 -11304  11305 -900  11308 0

c  -1+1 --> 0
c    ( b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0 ∧  p_900) -> (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧ -b^{10, 91}_0)
c  in CNF:
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_2
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_1
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_0
c  in DIMACS:
-11303  11304 -11305 -900 -11306 0
-11303  11304 -11305 -900 -11307 0
-11303  11304 -11305 -900 -11308 0

c  0+1 --> 1
c    (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧  p_900) -> (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0)
c  in CNF:
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_2
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_1
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨  b^{10, 91}_0
c  in DIMACS:
 11303  11304  11305 -900 -11306 0
 11303  11304  11305 -900 -11307 0
 11303  11304  11305 -900  11308 0

c  1+1 --> 2
c    (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0 ∧  p_900) -> (-b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0)
c  in CNF:
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_2
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨  b^{10, 91}_1
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ -p_900 ∨ -b^{10, 91}_0
c  in DIMACS:
 11303  11304 -11305 -900 -11306 0
 11303  11304 -11305 -900  11307 0
 11303  11304 -11305 -900 -11308 0

c  2+1 --> break 
c    (-b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧  p_900) -> break
c  in CNF:
c     b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 11303 -11304  11305 -900 1162 0


c  2-1 --> 1
c    (-b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧ -p_900) -> (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0)
c  in CNF:
c     b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_2
c     b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_1
c     b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨  b^{10, 91}_0
c  in DIMACS:
 11303 -11304  11305  900 -11306 0
 11303 -11304  11305  900 -11307 0
 11303 -11304  11305  900  11308 0

c  1-1 --> 0
c    (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0 ∧ -p_900) -> (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧ -b^{10, 91}_0)
c  in CNF:
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_2
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_1
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_0
c  in DIMACS:
 11303  11304 -11305  900 -11306 0
 11303  11304 -11305  900 -11307 0
 11303  11304 -11305  900 -11308 0

c  0-1 --> -1
c    (-b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧ -p_900) -> ( b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0)
c  in CNF:
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨  b^{10, 91}_2
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_1
c     b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨  b^{10, 91}_0
c  in DIMACS:
 11303  11304  11305  900  11306 0
 11303  11304  11305  900 -11307 0
 11303  11304  11305  900  11308 0

c  -1-1 --> -2
c    ( b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧  b^{10, 90}_0 ∧ -p_900) -> ( b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0)
c  in CNF:
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨  b^{10, 91}_2
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨  b^{10, 91}_1
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨  p_900 ∨ -b^{10, 91}_0
c  in DIMACS:
-11303  11304 -11305  900  11306 0
-11303  11304 -11305  900  11307 0
-11303  11304 -11305  900 -11308 0

c  -2-1 --> break 
c    ( b^{10, 90}_2 ∧  b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨  b^{10, 90}_0 ∨  p_900 ∨ break
c  in DIMACS:
-11303 -11304  11305  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 90}_2 ∧ -b^{10, 90}_1 ∧ -b^{10, 90}_0 ∧ true) 
c  in CNF:
c    -b^{10, 90}_2 ∨  b^{10, 90}_1 ∨  b^{10, 90}_0 ∨ false 
c  in DIMACS:
-11303  11304  11305  0

c  3 does not represent an automaton state.
c    -(-b^{10, 90}_2 ∧  b^{10, 90}_1 ∧  b^{10, 90}_0 ∧ true) 
c  in CNF:
c     b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ false 
c  in DIMACS:
 11303 -11304 -11305  0
c  -3 does not represent an automaton state.
c    -( b^{10, 90}_2 ∧  b^{10, 90}_1 ∧  b^{10, 90}_0 ∧ true) 
c  in CNF:
c    -b^{10, 90}_2 ∨ -b^{10, 90}_1 ∨ -b^{10, 90}_0 ∨ false 
c  in DIMACS:
-11303 -11304 -11305  0

c i = 91
c  -2+1 --> -1
c    ( b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧  p_910) -> ( b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0)
c  in CNF:
c    -b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨  b^{10, 92}_2
c    -b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_1
c    -b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨  b^{10, 92}_0
c  in DIMACS:
-11306 -11307  11308 -910  11309 0
-11306 -11307  11308 -910 -11310 0
-11306 -11307  11308 -910  11311 0

c  -1+1 --> 0
c    ( b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0 ∧  p_910) -> (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧ -b^{10, 92}_0)
c  in CNF:
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_2
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_1
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_0
c  in DIMACS:
-11306  11307 -11308 -910 -11309 0
-11306  11307 -11308 -910 -11310 0
-11306  11307 -11308 -910 -11311 0

c  0+1 --> 1
c    (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧  p_910) -> (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0)
c  in CNF:
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_2
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_1
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨  b^{10, 92}_0
c  in DIMACS:
 11306  11307  11308 -910 -11309 0
 11306  11307  11308 -910 -11310 0
 11306  11307  11308 -910  11311 0

c  1+1 --> 2
c    (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0 ∧  p_910) -> (-b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0)
c  in CNF:
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_2
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨  b^{10, 92}_1
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ -p_910 ∨ -b^{10, 92}_0
c  in DIMACS:
 11306  11307 -11308 -910 -11309 0
 11306  11307 -11308 -910  11310 0
 11306  11307 -11308 -910 -11311 0

c  2+1 --> break 
c    (-b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧  p_910) -> break
c  in CNF:
c     b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 11306 -11307  11308 -910 1162 0


c  2-1 --> 1
c    (-b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧ -p_910) -> (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0)
c  in CNF:
c     b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_2
c     b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_1
c     b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨  b^{10, 92}_0
c  in DIMACS:
 11306 -11307  11308  910 -11309 0
 11306 -11307  11308  910 -11310 0
 11306 -11307  11308  910  11311 0

c  1-1 --> 0
c    (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0 ∧ -p_910) -> (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧ -b^{10, 92}_0)
c  in CNF:
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_2
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_1
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_0
c  in DIMACS:
 11306  11307 -11308  910 -11309 0
 11306  11307 -11308  910 -11310 0
 11306  11307 -11308  910 -11311 0

c  0-1 --> -1
c    (-b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧ -p_910) -> ( b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0)
c  in CNF:
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨  b^{10, 92}_2
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_1
c     b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨  b^{10, 92}_0
c  in DIMACS:
 11306  11307  11308  910  11309 0
 11306  11307  11308  910 -11310 0
 11306  11307  11308  910  11311 0

c  -1-1 --> -2
c    ( b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧  b^{10, 91}_0 ∧ -p_910) -> ( b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0)
c  in CNF:
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨  b^{10, 92}_2
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨  b^{10, 92}_1
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨  p_910 ∨ -b^{10, 92}_0
c  in DIMACS:
-11306  11307 -11308  910  11309 0
-11306  11307 -11308  910  11310 0
-11306  11307 -11308  910 -11311 0

c  -2-1 --> break 
c    ( b^{10, 91}_2 ∧  b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨  b^{10, 91}_0 ∨  p_910 ∨ break
c  in DIMACS:
-11306 -11307  11308  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 91}_2 ∧ -b^{10, 91}_1 ∧ -b^{10, 91}_0 ∧ true) 
c  in CNF:
c    -b^{10, 91}_2 ∨  b^{10, 91}_1 ∨  b^{10, 91}_0 ∨ false 
c  in DIMACS:
-11306  11307  11308  0

c  3 does not represent an automaton state.
c    -(-b^{10, 91}_2 ∧  b^{10, 91}_1 ∧  b^{10, 91}_0 ∧ true) 
c  in CNF:
c     b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ false 
c  in DIMACS:
 11306 -11307 -11308  0
c  -3 does not represent an automaton state.
c    -( b^{10, 91}_2 ∧  b^{10, 91}_1 ∧  b^{10, 91}_0 ∧ true) 
c  in CNF:
c    -b^{10, 91}_2 ∨ -b^{10, 91}_1 ∨ -b^{10, 91}_0 ∨ false 
c  in DIMACS:
-11306 -11307 -11308  0

c i = 92
c  -2+1 --> -1
c    ( b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧  p_920) -> ( b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0)
c  in CNF:
c    -b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨  b^{10, 93}_2
c    -b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_1
c    -b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨  b^{10, 93}_0
c  in DIMACS:
-11309 -11310  11311 -920  11312 0
-11309 -11310  11311 -920 -11313 0
-11309 -11310  11311 -920  11314 0

c  -1+1 --> 0
c    ( b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0 ∧  p_920) -> (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧ -b^{10, 93}_0)
c  in CNF:
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_2
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_1
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_0
c  in DIMACS:
-11309  11310 -11311 -920 -11312 0
-11309  11310 -11311 -920 -11313 0
-11309  11310 -11311 -920 -11314 0

c  0+1 --> 1
c    (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧  p_920) -> (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0)
c  in CNF:
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_2
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_1
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨  b^{10, 93}_0
c  in DIMACS:
 11309  11310  11311 -920 -11312 0
 11309  11310  11311 -920 -11313 0
 11309  11310  11311 -920  11314 0

c  1+1 --> 2
c    (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0 ∧  p_920) -> (-b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0)
c  in CNF:
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_2
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨  b^{10, 93}_1
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ -p_920 ∨ -b^{10, 93}_0
c  in DIMACS:
 11309  11310 -11311 -920 -11312 0
 11309  11310 -11311 -920  11313 0
 11309  11310 -11311 -920 -11314 0

c  2+1 --> break 
c    (-b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧  p_920) -> break
c  in CNF:
c     b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 11309 -11310  11311 -920 1162 0


c  2-1 --> 1
c    (-b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧ -p_920) -> (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0)
c  in CNF:
c     b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_2
c     b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_1
c     b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨  b^{10, 93}_0
c  in DIMACS:
 11309 -11310  11311  920 -11312 0
 11309 -11310  11311  920 -11313 0
 11309 -11310  11311  920  11314 0

c  1-1 --> 0
c    (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0 ∧ -p_920) -> (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧ -b^{10, 93}_0)
c  in CNF:
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_2
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_1
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_0
c  in DIMACS:
 11309  11310 -11311  920 -11312 0
 11309  11310 -11311  920 -11313 0
 11309  11310 -11311  920 -11314 0

c  0-1 --> -1
c    (-b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧ -p_920) -> ( b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0)
c  in CNF:
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨  b^{10, 93}_2
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_1
c     b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨  b^{10, 93}_0
c  in DIMACS:
 11309  11310  11311  920  11312 0
 11309  11310  11311  920 -11313 0
 11309  11310  11311  920  11314 0

c  -1-1 --> -2
c    ( b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧  b^{10, 92}_0 ∧ -p_920) -> ( b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0)
c  in CNF:
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨  b^{10, 93}_2
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨  b^{10, 93}_1
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨  p_920 ∨ -b^{10, 93}_0
c  in DIMACS:
-11309  11310 -11311  920  11312 0
-11309  11310 -11311  920  11313 0
-11309  11310 -11311  920 -11314 0

c  -2-1 --> break 
c    ( b^{10, 92}_2 ∧  b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨  b^{10, 92}_0 ∨  p_920 ∨ break
c  in DIMACS:
-11309 -11310  11311  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 92}_2 ∧ -b^{10, 92}_1 ∧ -b^{10, 92}_0 ∧ true) 
c  in CNF:
c    -b^{10, 92}_2 ∨  b^{10, 92}_1 ∨  b^{10, 92}_0 ∨ false 
c  in DIMACS:
-11309  11310  11311  0

c  3 does not represent an automaton state.
c    -(-b^{10, 92}_2 ∧  b^{10, 92}_1 ∧  b^{10, 92}_0 ∧ true) 
c  in CNF:
c     b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ false 
c  in DIMACS:
 11309 -11310 -11311  0
c  -3 does not represent an automaton state.
c    -( b^{10, 92}_2 ∧  b^{10, 92}_1 ∧  b^{10, 92}_0 ∧ true) 
c  in CNF:
c    -b^{10, 92}_2 ∨ -b^{10, 92}_1 ∨ -b^{10, 92}_0 ∨ false 
c  in DIMACS:
-11309 -11310 -11311  0

c i = 93
c  -2+1 --> -1
c    ( b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧  p_930) -> ( b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0)
c  in CNF:
c    -b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨  b^{10, 94}_2
c    -b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_1
c    -b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨  b^{10, 94}_0
c  in DIMACS:
-11312 -11313  11314 -930  11315 0
-11312 -11313  11314 -930 -11316 0
-11312 -11313  11314 -930  11317 0

c  -1+1 --> 0
c    ( b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0 ∧  p_930) -> (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧ -b^{10, 94}_0)
c  in CNF:
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_2
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_1
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_0
c  in DIMACS:
-11312  11313 -11314 -930 -11315 0
-11312  11313 -11314 -930 -11316 0
-11312  11313 -11314 -930 -11317 0

c  0+1 --> 1
c    (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧  p_930) -> (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0)
c  in CNF:
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_2
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_1
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨  b^{10, 94}_0
c  in DIMACS:
 11312  11313  11314 -930 -11315 0
 11312  11313  11314 -930 -11316 0
 11312  11313  11314 -930  11317 0

c  1+1 --> 2
c    (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0 ∧  p_930) -> (-b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0)
c  in CNF:
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_2
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨  b^{10, 94}_1
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ -p_930 ∨ -b^{10, 94}_0
c  in DIMACS:
 11312  11313 -11314 -930 -11315 0
 11312  11313 -11314 -930  11316 0
 11312  11313 -11314 -930 -11317 0

c  2+1 --> break 
c    (-b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧  p_930) -> break
c  in CNF:
c     b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 11312 -11313  11314 -930 1162 0


c  2-1 --> 1
c    (-b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧ -p_930) -> (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0)
c  in CNF:
c     b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_2
c     b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_1
c     b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨  b^{10, 94}_0
c  in DIMACS:
 11312 -11313  11314  930 -11315 0
 11312 -11313  11314  930 -11316 0
 11312 -11313  11314  930  11317 0

c  1-1 --> 0
c    (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0 ∧ -p_930) -> (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧ -b^{10, 94}_0)
c  in CNF:
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_2
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_1
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_0
c  in DIMACS:
 11312  11313 -11314  930 -11315 0
 11312  11313 -11314  930 -11316 0
 11312  11313 -11314  930 -11317 0

c  0-1 --> -1
c    (-b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧ -p_930) -> ( b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0)
c  in CNF:
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨  b^{10, 94}_2
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_1
c     b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨  b^{10, 94}_0
c  in DIMACS:
 11312  11313  11314  930  11315 0
 11312  11313  11314  930 -11316 0
 11312  11313  11314  930  11317 0

c  -1-1 --> -2
c    ( b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧  b^{10, 93}_0 ∧ -p_930) -> ( b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0)
c  in CNF:
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨  b^{10, 94}_2
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨  b^{10, 94}_1
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨  p_930 ∨ -b^{10, 94}_0
c  in DIMACS:
-11312  11313 -11314  930  11315 0
-11312  11313 -11314  930  11316 0
-11312  11313 -11314  930 -11317 0

c  -2-1 --> break 
c    ( b^{10, 93}_2 ∧  b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨  b^{10, 93}_0 ∨  p_930 ∨ break
c  in DIMACS:
-11312 -11313  11314  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 93}_2 ∧ -b^{10, 93}_1 ∧ -b^{10, 93}_0 ∧ true) 
c  in CNF:
c    -b^{10, 93}_2 ∨  b^{10, 93}_1 ∨  b^{10, 93}_0 ∨ false 
c  in DIMACS:
-11312  11313  11314  0

c  3 does not represent an automaton state.
c    -(-b^{10, 93}_2 ∧  b^{10, 93}_1 ∧  b^{10, 93}_0 ∧ true) 
c  in CNF:
c     b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ false 
c  in DIMACS:
 11312 -11313 -11314  0
c  -3 does not represent an automaton state.
c    -( b^{10, 93}_2 ∧  b^{10, 93}_1 ∧  b^{10, 93}_0 ∧ true) 
c  in CNF:
c    -b^{10, 93}_2 ∨ -b^{10, 93}_1 ∨ -b^{10, 93}_0 ∨ false 
c  in DIMACS:
-11312 -11313 -11314  0

c i = 94
c  -2+1 --> -1
c    ( b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧  p_940) -> ( b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0)
c  in CNF:
c    -b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨  b^{10, 95}_2
c    -b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_1
c    -b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨  b^{10, 95}_0
c  in DIMACS:
-11315 -11316  11317 -940  11318 0
-11315 -11316  11317 -940 -11319 0
-11315 -11316  11317 -940  11320 0

c  -1+1 --> 0
c    ( b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0 ∧  p_940) -> (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧ -b^{10, 95}_0)
c  in CNF:
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_2
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_1
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_0
c  in DIMACS:
-11315  11316 -11317 -940 -11318 0
-11315  11316 -11317 -940 -11319 0
-11315  11316 -11317 -940 -11320 0

c  0+1 --> 1
c    (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧  p_940) -> (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0)
c  in CNF:
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_2
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_1
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨  b^{10, 95}_0
c  in DIMACS:
 11315  11316  11317 -940 -11318 0
 11315  11316  11317 -940 -11319 0
 11315  11316  11317 -940  11320 0

c  1+1 --> 2
c    (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0 ∧  p_940) -> (-b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0)
c  in CNF:
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_2
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨  b^{10, 95}_1
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ -p_940 ∨ -b^{10, 95}_0
c  in DIMACS:
 11315  11316 -11317 -940 -11318 0
 11315  11316 -11317 -940  11319 0
 11315  11316 -11317 -940 -11320 0

c  2+1 --> break 
c    (-b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧  p_940) -> break
c  in CNF:
c     b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 11315 -11316  11317 -940 1162 0


c  2-1 --> 1
c    (-b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧ -p_940) -> (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0)
c  in CNF:
c     b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_2
c     b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_1
c     b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨  b^{10, 95}_0
c  in DIMACS:
 11315 -11316  11317  940 -11318 0
 11315 -11316  11317  940 -11319 0
 11315 -11316  11317  940  11320 0

c  1-1 --> 0
c    (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0 ∧ -p_940) -> (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧ -b^{10, 95}_0)
c  in CNF:
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_2
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_1
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_0
c  in DIMACS:
 11315  11316 -11317  940 -11318 0
 11315  11316 -11317  940 -11319 0
 11315  11316 -11317  940 -11320 0

c  0-1 --> -1
c    (-b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧ -p_940) -> ( b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0)
c  in CNF:
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨  b^{10, 95}_2
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_1
c     b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨  b^{10, 95}_0
c  in DIMACS:
 11315  11316  11317  940  11318 0
 11315  11316  11317  940 -11319 0
 11315  11316  11317  940  11320 0

c  -1-1 --> -2
c    ( b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧  b^{10, 94}_0 ∧ -p_940) -> ( b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0)
c  in CNF:
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨  b^{10, 95}_2
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨  b^{10, 95}_1
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨  p_940 ∨ -b^{10, 95}_0
c  in DIMACS:
-11315  11316 -11317  940  11318 0
-11315  11316 -11317  940  11319 0
-11315  11316 -11317  940 -11320 0

c  -2-1 --> break 
c    ( b^{10, 94}_2 ∧  b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨  b^{10, 94}_0 ∨  p_940 ∨ break
c  in DIMACS:
-11315 -11316  11317  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 94}_2 ∧ -b^{10, 94}_1 ∧ -b^{10, 94}_0 ∧ true) 
c  in CNF:
c    -b^{10, 94}_2 ∨  b^{10, 94}_1 ∨  b^{10, 94}_0 ∨ false 
c  in DIMACS:
-11315  11316  11317  0

c  3 does not represent an automaton state.
c    -(-b^{10, 94}_2 ∧  b^{10, 94}_1 ∧  b^{10, 94}_0 ∧ true) 
c  in CNF:
c     b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ false 
c  in DIMACS:
 11315 -11316 -11317  0
c  -3 does not represent an automaton state.
c    -( b^{10, 94}_2 ∧  b^{10, 94}_1 ∧  b^{10, 94}_0 ∧ true) 
c  in CNF:
c    -b^{10, 94}_2 ∨ -b^{10, 94}_1 ∨ -b^{10, 94}_0 ∨ false 
c  in DIMACS:
-11315 -11316 -11317  0

c i = 95
c  -2+1 --> -1
c    ( b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧  p_950) -> ( b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0)
c  in CNF:
c    -b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨  b^{10, 96}_2
c    -b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_1
c    -b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨  b^{10, 96}_0
c  in DIMACS:
-11318 -11319  11320 -950  11321 0
-11318 -11319  11320 -950 -11322 0
-11318 -11319  11320 -950  11323 0

c  -1+1 --> 0
c    ( b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0 ∧  p_950) -> (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧ -b^{10, 96}_0)
c  in CNF:
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_2
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_1
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_0
c  in DIMACS:
-11318  11319 -11320 -950 -11321 0
-11318  11319 -11320 -950 -11322 0
-11318  11319 -11320 -950 -11323 0

c  0+1 --> 1
c    (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧  p_950) -> (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0)
c  in CNF:
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_2
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_1
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨  b^{10, 96}_0
c  in DIMACS:
 11318  11319  11320 -950 -11321 0
 11318  11319  11320 -950 -11322 0
 11318  11319  11320 -950  11323 0

c  1+1 --> 2
c    (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0 ∧  p_950) -> (-b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0)
c  in CNF:
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_2
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨  b^{10, 96}_1
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ -p_950 ∨ -b^{10, 96}_0
c  in DIMACS:
 11318  11319 -11320 -950 -11321 0
 11318  11319 -11320 -950  11322 0
 11318  11319 -11320 -950 -11323 0

c  2+1 --> break 
c    (-b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧  p_950) -> break
c  in CNF:
c     b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 11318 -11319  11320 -950 1162 0


c  2-1 --> 1
c    (-b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧ -p_950) -> (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0)
c  in CNF:
c     b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_2
c     b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_1
c     b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨  b^{10, 96}_0
c  in DIMACS:
 11318 -11319  11320  950 -11321 0
 11318 -11319  11320  950 -11322 0
 11318 -11319  11320  950  11323 0

c  1-1 --> 0
c    (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0 ∧ -p_950) -> (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧ -b^{10, 96}_0)
c  in CNF:
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_2
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_1
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_0
c  in DIMACS:
 11318  11319 -11320  950 -11321 0
 11318  11319 -11320  950 -11322 0
 11318  11319 -11320  950 -11323 0

c  0-1 --> -1
c    (-b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧ -p_950) -> ( b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0)
c  in CNF:
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨  b^{10, 96}_2
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_1
c     b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨  b^{10, 96}_0
c  in DIMACS:
 11318  11319  11320  950  11321 0
 11318  11319  11320  950 -11322 0
 11318  11319  11320  950  11323 0

c  -1-1 --> -2
c    ( b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧  b^{10, 95}_0 ∧ -p_950) -> ( b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0)
c  in CNF:
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨  b^{10, 96}_2
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨  b^{10, 96}_1
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨  p_950 ∨ -b^{10, 96}_0
c  in DIMACS:
-11318  11319 -11320  950  11321 0
-11318  11319 -11320  950  11322 0
-11318  11319 -11320  950 -11323 0

c  -2-1 --> break 
c    ( b^{10, 95}_2 ∧  b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨  b^{10, 95}_0 ∨  p_950 ∨ break
c  in DIMACS:
-11318 -11319  11320  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 95}_2 ∧ -b^{10, 95}_1 ∧ -b^{10, 95}_0 ∧ true) 
c  in CNF:
c    -b^{10, 95}_2 ∨  b^{10, 95}_1 ∨  b^{10, 95}_0 ∨ false 
c  in DIMACS:
-11318  11319  11320  0

c  3 does not represent an automaton state.
c    -(-b^{10, 95}_2 ∧  b^{10, 95}_1 ∧  b^{10, 95}_0 ∧ true) 
c  in CNF:
c     b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ false 
c  in DIMACS:
 11318 -11319 -11320  0
c  -3 does not represent an automaton state.
c    -( b^{10, 95}_2 ∧  b^{10, 95}_1 ∧  b^{10, 95}_0 ∧ true) 
c  in CNF:
c    -b^{10, 95}_2 ∨ -b^{10, 95}_1 ∨ -b^{10, 95}_0 ∨ false 
c  in DIMACS:
-11318 -11319 -11320  0

c i = 96
c  -2+1 --> -1
c    ( b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧  p_960) -> ( b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0)
c  in CNF:
c    -b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨  b^{10, 97}_2
c    -b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_1
c    -b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨  b^{10, 97}_0
c  in DIMACS:
-11321 -11322  11323 -960  11324 0
-11321 -11322  11323 -960 -11325 0
-11321 -11322  11323 -960  11326 0

c  -1+1 --> 0
c    ( b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0 ∧  p_960) -> (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧ -b^{10, 97}_0)
c  in CNF:
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_2
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_1
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_0
c  in DIMACS:
-11321  11322 -11323 -960 -11324 0
-11321  11322 -11323 -960 -11325 0
-11321  11322 -11323 -960 -11326 0

c  0+1 --> 1
c    (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧  p_960) -> (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0)
c  in CNF:
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_2
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_1
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨  b^{10, 97}_0
c  in DIMACS:
 11321  11322  11323 -960 -11324 0
 11321  11322  11323 -960 -11325 0
 11321  11322  11323 -960  11326 0

c  1+1 --> 2
c    (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0 ∧  p_960) -> (-b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0)
c  in CNF:
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_2
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨  b^{10, 97}_1
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ -p_960 ∨ -b^{10, 97}_0
c  in DIMACS:
 11321  11322 -11323 -960 -11324 0
 11321  11322 -11323 -960  11325 0
 11321  11322 -11323 -960 -11326 0

c  2+1 --> break 
c    (-b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧  p_960) -> break
c  in CNF:
c     b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 11321 -11322  11323 -960 1162 0


c  2-1 --> 1
c    (-b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧ -p_960) -> (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0)
c  in CNF:
c     b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_2
c     b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_1
c     b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨  b^{10, 97}_0
c  in DIMACS:
 11321 -11322  11323  960 -11324 0
 11321 -11322  11323  960 -11325 0
 11321 -11322  11323  960  11326 0

c  1-1 --> 0
c    (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0 ∧ -p_960) -> (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧ -b^{10, 97}_0)
c  in CNF:
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_2
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_1
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_0
c  in DIMACS:
 11321  11322 -11323  960 -11324 0
 11321  11322 -11323  960 -11325 0
 11321  11322 -11323  960 -11326 0

c  0-1 --> -1
c    (-b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧ -p_960) -> ( b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0)
c  in CNF:
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨  b^{10, 97}_2
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_1
c     b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨  b^{10, 97}_0
c  in DIMACS:
 11321  11322  11323  960  11324 0
 11321  11322  11323  960 -11325 0
 11321  11322  11323  960  11326 0

c  -1-1 --> -2
c    ( b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧  b^{10, 96}_0 ∧ -p_960) -> ( b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0)
c  in CNF:
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨  b^{10, 97}_2
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨  b^{10, 97}_1
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨  p_960 ∨ -b^{10, 97}_0
c  in DIMACS:
-11321  11322 -11323  960  11324 0
-11321  11322 -11323  960  11325 0
-11321  11322 -11323  960 -11326 0

c  -2-1 --> break 
c    ( b^{10, 96}_2 ∧  b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨  b^{10, 96}_0 ∨  p_960 ∨ break
c  in DIMACS:
-11321 -11322  11323  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 96}_2 ∧ -b^{10, 96}_1 ∧ -b^{10, 96}_0 ∧ true) 
c  in CNF:
c    -b^{10, 96}_2 ∨  b^{10, 96}_1 ∨  b^{10, 96}_0 ∨ false 
c  in DIMACS:
-11321  11322  11323  0

c  3 does not represent an automaton state.
c    -(-b^{10, 96}_2 ∧  b^{10, 96}_1 ∧  b^{10, 96}_0 ∧ true) 
c  in CNF:
c     b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ false 
c  in DIMACS:
 11321 -11322 -11323  0
c  -3 does not represent an automaton state.
c    -( b^{10, 96}_2 ∧  b^{10, 96}_1 ∧  b^{10, 96}_0 ∧ true) 
c  in CNF:
c    -b^{10, 96}_2 ∨ -b^{10, 96}_1 ∨ -b^{10, 96}_0 ∨ false 
c  in DIMACS:
-11321 -11322 -11323  0

c i = 97
c  -2+1 --> -1
c    ( b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧  p_970) -> ( b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0)
c  in CNF:
c    -b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨  b^{10, 98}_2
c    -b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_1
c    -b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨  b^{10, 98}_0
c  in DIMACS:
-11324 -11325  11326 -970  11327 0
-11324 -11325  11326 -970 -11328 0
-11324 -11325  11326 -970  11329 0

c  -1+1 --> 0
c    ( b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0 ∧  p_970) -> (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧ -b^{10, 98}_0)
c  in CNF:
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_2
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_1
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_0
c  in DIMACS:
-11324  11325 -11326 -970 -11327 0
-11324  11325 -11326 -970 -11328 0
-11324  11325 -11326 -970 -11329 0

c  0+1 --> 1
c    (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧  p_970) -> (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0)
c  in CNF:
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_2
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_1
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨  b^{10, 98}_0
c  in DIMACS:
 11324  11325  11326 -970 -11327 0
 11324  11325  11326 -970 -11328 0
 11324  11325  11326 -970  11329 0

c  1+1 --> 2
c    (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0 ∧  p_970) -> (-b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0)
c  in CNF:
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_2
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨  b^{10, 98}_1
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ -p_970 ∨ -b^{10, 98}_0
c  in DIMACS:
 11324  11325 -11326 -970 -11327 0
 11324  11325 -11326 -970  11328 0
 11324  11325 -11326 -970 -11329 0

c  2+1 --> break 
c    (-b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧  p_970) -> break
c  in CNF:
c     b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 11324 -11325  11326 -970 1162 0


c  2-1 --> 1
c    (-b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧ -p_970) -> (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0)
c  in CNF:
c     b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_2
c     b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_1
c     b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨  b^{10, 98}_0
c  in DIMACS:
 11324 -11325  11326  970 -11327 0
 11324 -11325  11326  970 -11328 0
 11324 -11325  11326  970  11329 0

c  1-1 --> 0
c    (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0 ∧ -p_970) -> (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧ -b^{10, 98}_0)
c  in CNF:
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_2
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_1
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_0
c  in DIMACS:
 11324  11325 -11326  970 -11327 0
 11324  11325 -11326  970 -11328 0
 11324  11325 -11326  970 -11329 0

c  0-1 --> -1
c    (-b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧ -p_970) -> ( b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0)
c  in CNF:
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨  b^{10, 98}_2
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_1
c     b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨  b^{10, 98}_0
c  in DIMACS:
 11324  11325  11326  970  11327 0
 11324  11325  11326  970 -11328 0
 11324  11325  11326  970  11329 0

c  -1-1 --> -2
c    ( b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧  b^{10, 97}_0 ∧ -p_970) -> ( b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0)
c  in CNF:
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨  b^{10, 98}_2
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨  b^{10, 98}_1
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨  p_970 ∨ -b^{10, 98}_0
c  in DIMACS:
-11324  11325 -11326  970  11327 0
-11324  11325 -11326  970  11328 0
-11324  11325 -11326  970 -11329 0

c  -2-1 --> break 
c    ( b^{10, 97}_2 ∧  b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨  b^{10, 97}_0 ∨  p_970 ∨ break
c  in DIMACS:
-11324 -11325  11326  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 97}_2 ∧ -b^{10, 97}_1 ∧ -b^{10, 97}_0 ∧ true) 
c  in CNF:
c    -b^{10, 97}_2 ∨  b^{10, 97}_1 ∨  b^{10, 97}_0 ∨ false 
c  in DIMACS:
-11324  11325  11326  0

c  3 does not represent an automaton state.
c    -(-b^{10, 97}_2 ∧  b^{10, 97}_1 ∧  b^{10, 97}_0 ∧ true) 
c  in CNF:
c     b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ false 
c  in DIMACS:
 11324 -11325 -11326  0
c  -3 does not represent an automaton state.
c    -( b^{10, 97}_2 ∧  b^{10, 97}_1 ∧  b^{10, 97}_0 ∧ true) 
c  in CNF:
c    -b^{10, 97}_2 ∨ -b^{10, 97}_1 ∨ -b^{10, 97}_0 ∨ false 
c  in DIMACS:
-11324 -11325 -11326  0

c i = 98
c  -2+1 --> -1
c    ( b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧  p_980) -> ( b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0)
c  in CNF:
c    -b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨  b^{10, 99}_2
c    -b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_1
c    -b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨  b^{10, 99}_0
c  in DIMACS:
-11327 -11328  11329 -980  11330 0
-11327 -11328  11329 -980 -11331 0
-11327 -11328  11329 -980  11332 0

c  -1+1 --> 0
c    ( b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0 ∧  p_980) -> (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧ -b^{10, 99}_0)
c  in CNF:
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_2
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_1
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_0
c  in DIMACS:
-11327  11328 -11329 -980 -11330 0
-11327  11328 -11329 -980 -11331 0
-11327  11328 -11329 -980 -11332 0

c  0+1 --> 1
c    (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧  p_980) -> (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0)
c  in CNF:
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_2
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_1
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨  b^{10, 99}_0
c  in DIMACS:
 11327  11328  11329 -980 -11330 0
 11327  11328  11329 -980 -11331 0
 11327  11328  11329 -980  11332 0

c  1+1 --> 2
c    (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0 ∧  p_980) -> (-b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0)
c  in CNF:
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_2
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨  b^{10, 99}_1
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ -p_980 ∨ -b^{10, 99}_0
c  in DIMACS:
 11327  11328 -11329 -980 -11330 0
 11327  11328 -11329 -980  11331 0
 11327  11328 -11329 -980 -11332 0

c  2+1 --> break 
c    (-b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧  p_980) -> break
c  in CNF:
c     b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 11327 -11328  11329 -980 1162 0


c  2-1 --> 1
c    (-b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧ -p_980) -> (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0)
c  in CNF:
c     b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_2
c     b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_1
c     b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨  b^{10, 99}_0
c  in DIMACS:
 11327 -11328  11329  980 -11330 0
 11327 -11328  11329  980 -11331 0
 11327 -11328  11329  980  11332 0

c  1-1 --> 0
c    (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0 ∧ -p_980) -> (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧ -b^{10, 99}_0)
c  in CNF:
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_2
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_1
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_0
c  in DIMACS:
 11327  11328 -11329  980 -11330 0
 11327  11328 -11329  980 -11331 0
 11327  11328 -11329  980 -11332 0

c  0-1 --> -1
c    (-b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧ -p_980) -> ( b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0)
c  in CNF:
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨  b^{10, 99}_2
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_1
c     b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨  b^{10, 99}_0
c  in DIMACS:
 11327  11328  11329  980  11330 0
 11327  11328  11329  980 -11331 0
 11327  11328  11329  980  11332 0

c  -1-1 --> -2
c    ( b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧  b^{10, 98}_0 ∧ -p_980) -> ( b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0)
c  in CNF:
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨  b^{10, 99}_2
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨  b^{10, 99}_1
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨  p_980 ∨ -b^{10, 99}_0
c  in DIMACS:
-11327  11328 -11329  980  11330 0
-11327  11328 -11329  980  11331 0
-11327  11328 -11329  980 -11332 0

c  -2-1 --> break 
c    ( b^{10, 98}_2 ∧  b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨  b^{10, 98}_0 ∨  p_980 ∨ break
c  in DIMACS:
-11327 -11328  11329  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 98}_2 ∧ -b^{10, 98}_1 ∧ -b^{10, 98}_0 ∧ true) 
c  in CNF:
c    -b^{10, 98}_2 ∨  b^{10, 98}_1 ∨  b^{10, 98}_0 ∨ false 
c  in DIMACS:
-11327  11328  11329  0

c  3 does not represent an automaton state.
c    -(-b^{10, 98}_2 ∧  b^{10, 98}_1 ∧  b^{10, 98}_0 ∧ true) 
c  in CNF:
c     b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ false 
c  in DIMACS:
 11327 -11328 -11329  0
c  -3 does not represent an automaton state.
c    -( b^{10, 98}_2 ∧  b^{10, 98}_1 ∧  b^{10, 98}_0 ∧ true) 
c  in CNF:
c    -b^{10, 98}_2 ∨ -b^{10, 98}_1 ∨ -b^{10, 98}_0 ∨ false 
c  in DIMACS:
-11327 -11328 -11329  0

c i = 99
c  -2+1 --> -1
c    ( b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧  p_990) -> ( b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0)
c  in CNF:
c    -b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨  b^{10, 100}_2
c    -b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_1
c    -b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨  b^{10, 100}_0
c  in DIMACS:
-11330 -11331  11332 -990  11333 0
-11330 -11331  11332 -990 -11334 0
-11330 -11331  11332 -990  11335 0

c  -1+1 --> 0
c    ( b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0 ∧  p_990) -> (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧ -b^{10, 100}_0)
c  in CNF:
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_2
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_1
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_0
c  in DIMACS:
-11330  11331 -11332 -990 -11333 0
-11330  11331 -11332 -990 -11334 0
-11330  11331 -11332 -990 -11335 0

c  0+1 --> 1
c    (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧  p_990) -> (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0)
c  in CNF:
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_2
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_1
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨  b^{10, 100}_0
c  in DIMACS:
 11330  11331  11332 -990 -11333 0
 11330  11331  11332 -990 -11334 0
 11330  11331  11332 -990  11335 0

c  1+1 --> 2
c    (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0 ∧  p_990) -> (-b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0)
c  in CNF:
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_2
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨  b^{10, 100}_1
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ -p_990 ∨ -b^{10, 100}_0
c  in DIMACS:
 11330  11331 -11332 -990 -11333 0
 11330  11331 -11332 -990  11334 0
 11330  11331 -11332 -990 -11335 0

c  2+1 --> break 
c    (-b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧  p_990) -> break
c  in CNF:
c     b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 11330 -11331  11332 -990 1162 0


c  2-1 --> 1
c    (-b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧ -p_990) -> (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0)
c  in CNF:
c     b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_2
c     b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_1
c     b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨  b^{10, 100}_0
c  in DIMACS:
 11330 -11331  11332  990 -11333 0
 11330 -11331  11332  990 -11334 0
 11330 -11331  11332  990  11335 0

c  1-1 --> 0
c    (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0 ∧ -p_990) -> (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧ -b^{10, 100}_0)
c  in CNF:
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_2
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_1
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_0
c  in DIMACS:
 11330  11331 -11332  990 -11333 0
 11330  11331 -11332  990 -11334 0
 11330  11331 -11332  990 -11335 0

c  0-1 --> -1
c    (-b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧ -p_990) -> ( b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0)
c  in CNF:
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨  b^{10, 100}_2
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_1
c     b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨  b^{10, 100}_0
c  in DIMACS:
 11330  11331  11332  990  11333 0
 11330  11331  11332  990 -11334 0
 11330  11331  11332  990  11335 0

c  -1-1 --> -2
c    ( b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧  b^{10, 99}_0 ∧ -p_990) -> ( b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0)
c  in CNF:
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨  b^{10, 100}_2
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨  b^{10, 100}_1
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨  p_990 ∨ -b^{10, 100}_0
c  in DIMACS:
-11330  11331 -11332  990  11333 0
-11330  11331 -11332  990  11334 0
-11330  11331 -11332  990 -11335 0

c  -2-1 --> break 
c    ( b^{10, 99}_2 ∧  b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨  b^{10, 99}_0 ∨  p_990 ∨ break
c  in DIMACS:
-11330 -11331  11332  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 99}_2 ∧ -b^{10, 99}_1 ∧ -b^{10, 99}_0 ∧ true) 
c  in CNF:
c    -b^{10, 99}_2 ∨  b^{10, 99}_1 ∨  b^{10, 99}_0 ∨ false 
c  in DIMACS:
-11330  11331  11332  0

c  3 does not represent an automaton state.
c    -(-b^{10, 99}_2 ∧  b^{10, 99}_1 ∧  b^{10, 99}_0 ∧ true) 
c  in CNF:
c     b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ false 
c  in DIMACS:
 11330 -11331 -11332  0
c  -3 does not represent an automaton state.
c    -( b^{10, 99}_2 ∧  b^{10, 99}_1 ∧  b^{10, 99}_0 ∧ true) 
c  in CNF:
c    -b^{10, 99}_2 ∨ -b^{10, 99}_1 ∨ -b^{10, 99}_0 ∨ false 
c  in DIMACS:
-11330 -11331 -11332  0

c i = 100
c  -2+1 --> -1
c    ( b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧  p_1000) -> ( b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0)
c  in CNF:
c    -b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨  b^{10, 101}_2
c    -b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_1
c    -b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨  b^{10, 101}_0
c  in DIMACS:
-11333 -11334  11335 -1000  11336 0
-11333 -11334  11335 -1000 -11337 0
-11333 -11334  11335 -1000  11338 0

c  -1+1 --> 0
c    ( b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0 ∧  p_1000) -> (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧ -b^{10, 101}_0)
c  in CNF:
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_2
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_1
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_0
c  in DIMACS:
-11333  11334 -11335 -1000 -11336 0
-11333  11334 -11335 -1000 -11337 0
-11333  11334 -11335 -1000 -11338 0

c  0+1 --> 1
c    (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧  p_1000) -> (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0)
c  in CNF:
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_2
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_1
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨  b^{10, 101}_0
c  in DIMACS:
 11333  11334  11335 -1000 -11336 0
 11333  11334  11335 -1000 -11337 0
 11333  11334  11335 -1000  11338 0

c  1+1 --> 2
c    (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0 ∧  p_1000) -> (-b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0)
c  in CNF:
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_2
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨  b^{10, 101}_1
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ -p_1000 ∨ -b^{10, 101}_0
c  in DIMACS:
 11333  11334 -11335 -1000 -11336 0
 11333  11334 -11335 -1000  11337 0
 11333  11334 -11335 -1000 -11338 0

c  2+1 --> break 
c    (-b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 11333 -11334  11335 -1000 1162 0


c  2-1 --> 1
c    (-b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧ -p_1000) -> (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0)
c  in CNF:
c     b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_2
c     b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_1
c     b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨  b^{10, 101}_0
c  in DIMACS:
 11333 -11334  11335  1000 -11336 0
 11333 -11334  11335  1000 -11337 0
 11333 -11334  11335  1000  11338 0

c  1-1 --> 0
c    (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0 ∧ -p_1000) -> (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧ -b^{10, 101}_0)
c  in CNF:
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_2
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_1
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_0
c  in DIMACS:
 11333  11334 -11335  1000 -11336 0
 11333  11334 -11335  1000 -11337 0
 11333  11334 -11335  1000 -11338 0

c  0-1 --> -1
c    (-b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧ -p_1000) -> ( b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0)
c  in CNF:
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨  b^{10, 101}_2
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_1
c     b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨  b^{10, 101}_0
c  in DIMACS:
 11333  11334  11335  1000  11336 0
 11333  11334  11335  1000 -11337 0
 11333  11334  11335  1000  11338 0

c  -1-1 --> -2
c    ( b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧  b^{10, 100}_0 ∧ -p_1000) -> ( b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0)
c  in CNF:
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨  b^{10, 101}_2
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨  b^{10, 101}_1
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨  p_1000 ∨ -b^{10, 101}_0
c  in DIMACS:
-11333  11334 -11335  1000  11336 0
-11333  11334 -11335  1000  11337 0
-11333  11334 -11335  1000 -11338 0

c  -2-1 --> break 
c    ( b^{10, 100}_2 ∧  b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨  b^{10, 100}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-11333 -11334  11335  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 100}_2 ∧ -b^{10, 100}_1 ∧ -b^{10, 100}_0 ∧ true) 
c  in CNF:
c    -b^{10, 100}_2 ∨  b^{10, 100}_1 ∨  b^{10, 100}_0 ∨ false 
c  in DIMACS:
-11333  11334  11335  0

c  3 does not represent an automaton state.
c    -(-b^{10, 100}_2 ∧  b^{10, 100}_1 ∧  b^{10, 100}_0 ∧ true) 
c  in CNF:
c     b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ false 
c  in DIMACS:
 11333 -11334 -11335  0
c  -3 does not represent an automaton state.
c    -( b^{10, 100}_2 ∧  b^{10, 100}_1 ∧  b^{10, 100}_0 ∧ true) 
c  in CNF:
c    -b^{10, 100}_2 ∨ -b^{10, 100}_1 ∨ -b^{10, 100}_0 ∨ false 
c  in DIMACS:
-11333 -11334 -11335  0

c i = 101
c  -2+1 --> -1
c    ( b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧  p_1010) -> ( b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0)
c  in CNF:
c    -b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨  b^{10, 102}_2
c    -b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_1
c    -b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨  b^{10, 102}_0
c  in DIMACS:
-11336 -11337  11338 -1010  11339 0
-11336 -11337  11338 -1010 -11340 0
-11336 -11337  11338 -1010  11341 0

c  -1+1 --> 0
c    ( b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0 ∧  p_1010) -> (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧ -b^{10, 102}_0)
c  in CNF:
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_2
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_1
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_0
c  in DIMACS:
-11336  11337 -11338 -1010 -11339 0
-11336  11337 -11338 -1010 -11340 0
-11336  11337 -11338 -1010 -11341 0

c  0+1 --> 1
c    (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧  p_1010) -> (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0)
c  in CNF:
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_2
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_1
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨  b^{10, 102}_0
c  in DIMACS:
 11336  11337  11338 -1010 -11339 0
 11336  11337  11338 -1010 -11340 0
 11336  11337  11338 -1010  11341 0

c  1+1 --> 2
c    (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0 ∧  p_1010) -> (-b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0)
c  in CNF:
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_2
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨  b^{10, 102}_1
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ -p_1010 ∨ -b^{10, 102}_0
c  in DIMACS:
 11336  11337 -11338 -1010 -11339 0
 11336  11337 -11338 -1010  11340 0
 11336  11337 -11338 -1010 -11341 0

c  2+1 --> break 
c    (-b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 11336 -11337  11338 -1010 1162 0


c  2-1 --> 1
c    (-b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧ -p_1010) -> (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0)
c  in CNF:
c     b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_2
c     b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_1
c     b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨  b^{10, 102}_0
c  in DIMACS:
 11336 -11337  11338  1010 -11339 0
 11336 -11337  11338  1010 -11340 0
 11336 -11337  11338  1010  11341 0

c  1-1 --> 0
c    (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0 ∧ -p_1010) -> (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧ -b^{10, 102}_0)
c  in CNF:
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_2
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_1
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_0
c  in DIMACS:
 11336  11337 -11338  1010 -11339 0
 11336  11337 -11338  1010 -11340 0
 11336  11337 -11338  1010 -11341 0

c  0-1 --> -1
c    (-b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧ -p_1010) -> ( b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0)
c  in CNF:
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨  b^{10, 102}_2
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_1
c     b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨  b^{10, 102}_0
c  in DIMACS:
 11336  11337  11338  1010  11339 0
 11336  11337  11338  1010 -11340 0
 11336  11337  11338  1010  11341 0

c  -1-1 --> -2
c    ( b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧  b^{10, 101}_0 ∧ -p_1010) -> ( b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0)
c  in CNF:
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨  b^{10, 102}_2
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨  b^{10, 102}_1
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨  p_1010 ∨ -b^{10, 102}_0
c  in DIMACS:
-11336  11337 -11338  1010  11339 0
-11336  11337 -11338  1010  11340 0
-11336  11337 -11338  1010 -11341 0

c  -2-1 --> break 
c    ( b^{10, 101}_2 ∧  b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨  b^{10, 101}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-11336 -11337  11338  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 101}_2 ∧ -b^{10, 101}_1 ∧ -b^{10, 101}_0 ∧ true) 
c  in CNF:
c    -b^{10, 101}_2 ∨  b^{10, 101}_1 ∨  b^{10, 101}_0 ∨ false 
c  in DIMACS:
-11336  11337  11338  0

c  3 does not represent an automaton state.
c    -(-b^{10, 101}_2 ∧  b^{10, 101}_1 ∧  b^{10, 101}_0 ∧ true) 
c  in CNF:
c     b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ false 
c  in DIMACS:
 11336 -11337 -11338  0
c  -3 does not represent an automaton state.
c    -( b^{10, 101}_2 ∧  b^{10, 101}_1 ∧  b^{10, 101}_0 ∧ true) 
c  in CNF:
c    -b^{10, 101}_2 ∨ -b^{10, 101}_1 ∨ -b^{10, 101}_0 ∨ false 
c  in DIMACS:
-11336 -11337 -11338  0

c i = 102
c  -2+1 --> -1
c    ( b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧  p_1020) -> ( b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0)
c  in CNF:
c    -b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨  b^{10, 103}_2
c    -b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_1
c    -b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨  b^{10, 103}_0
c  in DIMACS:
-11339 -11340  11341 -1020  11342 0
-11339 -11340  11341 -1020 -11343 0
-11339 -11340  11341 -1020  11344 0

c  -1+1 --> 0
c    ( b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0 ∧  p_1020) -> (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧ -b^{10, 103}_0)
c  in CNF:
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_2
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_1
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_0
c  in DIMACS:
-11339  11340 -11341 -1020 -11342 0
-11339  11340 -11341 -1020 -11343 0
-11339  11340 -11341 -1020 -11344 0

c  0+1 --> 1
c    (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧  p_1020) -> (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0)
c  in CNF:
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_2
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_1
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨  b^{10, 103}_0
c  in DIMACS:
 11339  11340  11341 -1020 -11342 0
 11339  11340  11341 -1020 -11343 0
 11339  11340  11341 -1020  11344 0

c  1+1 --> 2
c    (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0 ∧  p_1020) -> (-b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0)
c  in CNF:
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_2
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨  b^{10, 103}_1
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ -p_1020 ∨ -b^{10, 103}_0
c  in DIMACS:
 11339  11340 -11341 -1020 -11342 0
 11339  11340 -11341 -1020  11343 0
 11339  11340 -11341 -1020 -11344 0

c  2+1 --> break 
c    (-b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 11339 -11340  11341 -1020 1162 0


c  2-1 --> 1
c    (-b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧ -p_1020) -> (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0)
c  in CNF:
c     b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_2
c     b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_1
c     b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨  b^{10, 103}_0
c  in DIMACS:
 11339 -11340  11341  1020 -11342 0
 11339 -11340  11341  1020 -11343 0
 11339 -11340  11341  1020  11344 0

c  1-1 --> 0
c    (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0 ∧ -p_1020) -> (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧ -b^{10, 103}_0)
c  in CNF:
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_2
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_1
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_0
c  in DIMACS:
 11339  11340 -11341  1020 -11342 0
 11339  11340 -11341  1020 -11343 0
 11339  11340 -11341  1020 -11344 0

c  0-1 --> -1
c    (-b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧ -p_1020) -> ( b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0)
c  in CNF:
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨  b^{10, 103}_2
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_1
c     b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨  b^{10, 103}_0
c  in DIMACS:
 11339  11340  11341  1020  11342 0
 11339  11340  11341  1020 -11343 0
 11339  11340  11341  1020  11344 0

c  -1-1 --> -2
c    ( b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧  b^{10, 102}_0 ∧ -p_1020) -> ( b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0)
c  in CNF:
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨  b^{10, 103}_2
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨  b^{10, 103}_1
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨  p_1020 ∨ -b^{10, 103}_0
c  in DIMACS:
-11339  11340 -11341  1020  11342 0
-11339  11340 -11341  1020  11343 0
-11339  11340 -11341  1020 -11344 0

c  -2-1 --> break 
c    ( b^{10, 102}_2 ∧  b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨  b^{10, 102}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-11339 -11340  11341  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 102}_2 ∧ -b^{10, 102}_1 ∧ -b^{10, 102}_0 ∧ true) 
c  in CNF:
c    -b^{10, 102}_2 ∨  b^{10, 102}_1 ∨  b^{10, 102}_0 ∨ false 
c  in DIMACS:
-11339  11340  11341  0

c  3 does not represent an automaton state.
c    -(-b^{10, 102}_2 ∧  b^{10, 102}_1 ∧  b^{10, 102}_0 ∧ true) 
c  in CNF:
c     b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ false 
c  in DIMACS:
 11339 -11340 -11341  0
c  -3 does not represent an automaton state.
c    -( b^{10, 102}_2 ∧  b^{10, 102}_1 ∧  b^{10, 102}_0 ∧ true) 
c  in CNF:
c    -b^{10, 102}_2 ∨ -b^{10, 102}_1 ∨ -b^{10, 102}_0 ∨ false 
c  in DIMACS:
-11339 -11340 -11341  0

c i = 103
c  -2+1 --> -1
c    ( b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧  p_1030) -> ( b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0)
c  in CNF:
c    -b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨  b^{10, 104}_2
c    -b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_1
c    -b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨  b^{10, 104}_0
c  in DIMACS:
-11342 -11343  11344 -1030  11345 0
-11342 -11343  11344 -1030 -11346 0
-11342 -11343  11344 -1030  11347 0

c  -1+1 --> 0
c    ( b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0 ∧  p_1030) -> (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧ -b^{10, 104}_0)
c  in CNF:
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_2
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_1
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_0
c  in DIMACS:
-11342  11343 -11344 -1030 -11345 0
-11342  11343 -11344 -1030 -11346 0
-11342  11343 -11344 -1030 -11347 0

c  0+1 --> 1
c    (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧  p_1030) -> (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0)
c  in CNF:
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_2
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_1
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨  b^{10, 104}_0
c  in DIMACS:
 11342  11343  11344 -1030 -11345 0
 11342  11343  11344 -1030 -11346 0
 11342  11343  11344 -1030  11347 0

c  1+1 --> 2
c    (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0 ∧  p_1030) -> (-b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0)
c  in CNF:
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_2
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨  b^{10, 104}_1
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ -p_1030 ∨ -b^{10, 104}_0
c  in DIMACS:
 11342  11343 -11344 -1030 -11345 0
 11342  11343 -11344 -1030  11346 0
 11342  11343 -11344 -1030 -11347 0

c  2+1 --> break 
c    (-b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 11342 -11343  11344 -1030 1162 0


c  2-1 --> 1
c    (-b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧ -p_1030) -> (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0)
c  in CNF:
c     b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_2
c     b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_1
c     b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨  b^{10, 104}_0
c  in DIMACS:
 11342 -11343  11344  1030 -11345 0
 11342 -11343  11344  1030 -11346 0
 11342 -11343  11344  1030  11347 0

c  1-1 --> 0
c    (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0 ∧ -p_1030) -> (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧ -b^{10, 104}_0)
c  in CNF:
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_2
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_1
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_0
c  in DIMACS:
 11342  11343 -11344  1030 -11345 0
 11342  11343 -11344  1030 -11346 0
 11342  11343 -11344  1030 -11347 0

c  0-1 --> -1
c    (-b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧ -p_1030) -> ( b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0)
c  in CNF:
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨  b^{10, 104}_2
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_1
c     b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨  b^{10, 104}_0
c  in DIMACS:
 11342  11343  11344  1030  11345 0
 11342  11343  11344  1030 -11346 0
 11342  11343  11344  1030  11347 0

c  -1-1 --> -2
c    ( b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧  b^{10, 103}_0 ∧ -p_1030) -> ( b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0)
c  in CNF:
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨  b^{10, 104}_2
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨  b^{10, 104}_1
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨  p_1030 ∨ -b^{10, 104}_0
c  in DIMACS:
-11342  11343 -11344  1030  11345 0
-11342  11343 -11344  1030  11346 0
-11342  11343 -11344  1030 -11347 0

c  -2-1 --> break 
c    ( b^{10, 103}_2 ∧  b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨  b^{10, 103}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-11342 -11343  11344  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 103}_2 ∧ -b^{10, 103}_1 ∧ -b^{10, 103}_0 ∧ true) 
c  in CNF:
c    -b^{10, 103}_2 ∨  b^{10, 103}_1 ∨  b^{10, 103}_0 ∨ false 
c  in DIMACS:
-11342  11343  11344  0

c  3 does not represent an automaton state.
c    -(-b^{10, 103}_2 ∧  b^{10, 103}_1 ∧  b^{10, 103}_0 ∧ true) 
c  in CNF:
c     b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ false 
c  in DIMACS:
 11342 -11343 -11344  0
c  -3 does not represent an automaton state.
c    -( b^{10, 103}_2 ∧  b^{10, 103}_1 ∧  b^{10, 103}_0 ∧ true) 
c  in CNF:
c    -b^{10, 103}_2 ∨ -b^{10, 103}_1 ∨ -b^{10, 103}_0 ∨ false 
c  in DIMACS:
-11342 -11343 -11344  0

c i = 104
c  -2+1 --> -1
c    ( b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧  p_1040) -> ( b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0)
c  in CNF:
c    -b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨  b^{10, 105}_2
c    -b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_1
c    -b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨  b^{10, 105}_0
c  in DIMACS:
-11345 -11346  11347 -1040  11348 0
-11345 -11346  11347 -1040 -11349 0
-11345 -11346  11347 -1040  11350 0

c  -1+1 --> 0
c    ( b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0 ∧  p_1040) -> (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧ -b^{10, 105}_0)
c  in CNF:
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_2
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_1
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_0
c  in DIMACS:
-11345  11346 -11347 -1040 -11348 0
-11345  11346 -11347 -1040 -11349 0
-11345  11346 -11347 -1040 -11350 0

c  0+1 --> 1
c    (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧  p_1040) -> (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0)
c  in CNF:
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_2
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_1
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨  b^{10, 105}_0
c  in DIMACS:
 11345  11346  11347 -1040 -11348 0
 11345  11346  11347 -1040 -11349 0
 11345  11346  11347 -1040  11350 0

c  1+1 --> 2
c    (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0 ∧  p_1040) -> (-b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0)
c  in CNF:
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_2
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨  b^{10, 105}_1
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ -p_1040 ∨ -b^{10, 105}_0
c  in DIMACS:
 11345  11346 -11347 -1040 -11348 0
 11345  11346 -11347 -1040  11349 0
 11345  11346 -11347 -1040 -11350 0

c  2+1 --> break 
c    (-b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 11345 -11346  11347 -1040 1162 0


c  2-1 --> 1
c    (-b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧ -p_1040) -> (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0)
c  in CNF:
c     b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_2
c     b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_1
c     b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨  b^{10, 105}_0
c  in DIMACS:
 11345 -11346  11347  1040 -11348 0
 11345 -11346  11347  1040 -11349 0
 11345 -11346  11347  1040  11350 0

c  1-1 --> 0
c    (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0 ∧ -p_1040) -> (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧ -b^{10, 105}_0)
c  in CNF:
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_2
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_1
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_0
c  in DIMACS:
 11345  11346 -11347  1040 -11348 0
 11345  11346 -11347  1040 -11349 0
 11345  11346 -11347  1040 -11350 0

c  0-1 --> -1
c    (-b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧ -p_1040) -> ( b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0)
c  in CNF:
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨  b^{10, 105}_2
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_1
c     b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨  b^{10, 105}_0
c  in DIMACS:
 11345  11346  11347  1040  11348 0
 11345  11346  11347  1040 -11349 0
 11345  11346  11347  1040  11350 0

c  -1-1 --> -2
c    ( b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧  b^{10, 104}_0 ∧ -p_1040) -> ( b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0)
c  in CNF:
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨  b^{10, 105}_2
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨  b^{10, 105}_1
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨  p_1040 ∨ -b^{10, 105}_0
c  in DIMACS:
-11345  11346 -11347  1040  11348 0
-11345  11346 -11347  1040  11349 0
-11345  11346 -11347  1040 -11350 0

c  -2-1 --> break 
c    ( b^{10, 104}_2 ∧  b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨  b^{10, 104}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-11345 -11346  11347  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 104}_2 ∧ -b^{10, 104}_1 ∧ -b^{10, 104}_0 ∧ true) 
c  in CNF:
c    -b^{10, 104}_2 ∨  b^{10, 104}_1 ∨  b^{10, 104}_0 ∨ false 
c  in DIMACS:
-11345  11346  11347  0

c  3 does not represent an automaton state.
c    -(-b^{10, 104}_2 ∧  b^{10, 104}_1 ∧  b^{10, 104}_0 ∧ true) 
c  in CNF:
c     b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ false 
c  in DIMACS:
 11345 -11346 -11347  0
c  -3 does not represent an automaton state.
c    -( b^{10, 104}_2 ∧  b^{10, 104}_1 ∧  b^{10, 104}_0 ∧ true) 
c  in CNF:
c    -b^{10, 104}_2 ∨ -b^{10, 104}_1 ∨ -b^{10, 104}_0 ∨ false 
c  in DIMACS:
-11345 -11346 -11347  0

c i = 105
c  -2+1 --> -1
c    ( b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧  p_1050) -> ( b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0)
c  in CNF:
c    -b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨  b^{10, 106}_2
c    -b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_1
c    -b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨  b^{10, 106}_0
c  in DIMACS:
-11348 -11349  11350 -1050  11351 0
-11348 -11349  11350 -1050 -11352 0
-11348 -11349  11350 -1050  11353 0

c  -1+1 --> 0
c    ( b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0 ∧  p_1050) -> (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧ -b^{10, 106}_0)
c  in CNF:
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_2
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_1
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_0
c  in DIMACS:
-11348  11349 -11350 -1050 -11351 0
-11348  11349 -11350 -1050 -11352 0
-11348  11349 -11350 -1050 -11353 0

c  0+1 --> 1
c    (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧  p_1050) -> (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0)
c  in CNF:
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_2
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_1
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨  b^{10, 106}_0
c  in DIMACS:
 11348  11349  11350 -1050 -11351 0
 11348  11349  11350 -1050 -11352 0
 11348  11349  11350 -1050  11353 0

c  1+1 --> 2
c    (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0 ∧  p_1050) -> (-b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0)
c  in CNF:
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_2
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨  b^{10, 106}_1
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ -p_1050 ∨ -b^{10, 106}_0
c  in DIMACS:
 11348  11349 -11350 -1050 -11351 0
 11348  11349 -11350 -1050  11352 0
 11348  11349 -11350 -1050 -11353 0

c  2+1 --> break 
c    (-b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 11348 -11349  11350 -1050 1162 0


c  2-1 --> 1
c    (-b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧ -p_1050) -> (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0)
c  in CNF:
c     b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_2
c     b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_1
c     b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨  b^{10, 106}_0
c  in DIMACS:
 11348 -11349  11350  1050 -11351 0
 11348 -11349  11350  1050 -11352 0
 11348 -11349  11350  1050  11353 0

c  1-1 --> 0
c    (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0 ∧ -p_1050) -> (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧ -b^{10, 106}_0)
c  in CNF:
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_2
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_1
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_0
c  in DIMACS:
 11348  11349 -11350  1050 -11351 0
 11348  11349 -11350  1050 -11352 0
 11348  11349 -11350  1050 -11353 0

c  0-1 --> -1
c    (-b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧ -p_1050) -> ( b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0)
c  in CNF:
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨  b^{10, 106}_2
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_1
c     b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨  b^{10, 106}_0
c  in DIMACS:
 11348  11349  11350  1050  11351 0
 11348  11349  11350  1050 -11352 0
 11348  11349  11350  1050  11353 0

c  -1-1 --> -2
c    ( b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧  b^{10, 105}_0 ∧ -p_1050) -> ( b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0)
c  in CNF:
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨  b^{10, 106}_2
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨  b^{10, 106}_1
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨  p_1050 ∨ -b^{10, 106}_0
c  in DIMACS:
-11348  11349 -11350  1050  11351 0
-11348  11349 -11350  1050  11352 0
-11348  11349 -11350  1050 -11353 0

c  -2-1 --> break 
c    ( b^{10, 105}_2 ∧  b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨  b^{10, 105}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-11348 -11349  11350  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 105}_2 ∧ -b^{10, 105}_1 ∧ -b^{10, 105}_0 ∧ true) 
c  in CNF:
c    -b^{10, 105}_2 ∨  b^{10, 105}_1 ∨  b^{10, 105}_0 ∨ false 
c  in DIMACS:
-11348  11349  11350  0

c  3 does not represent an automaton state.
c    -(-b^{10, 105}_2 ∧  b^{10, 105}_1 ∧  b^{10, 105}_0 ∧ true) 
c  in CNF:
c     b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ false 
c  in DIMACS:
 11348 -11349 -11350  0
c  -3 does not represent an automaton state.
c    -( b^{10, 105}_2 ∧  b^{10, 105}_1 ∧  b^{10, 105}_0 ∧ true) 
c  in CNF:
c    -b^{10, 105}_2 ∨ -b^{10, 105}_1 ∨ -b^{10, 105}_0 ∨ false 
c  in DIMACS:
-11348 -11349 -11350  0

c i = 106
c  -2+1 --> -1
c    ( b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧  p_1060) -> ( b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0)
c  in CNF:
c    -b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨  b^{10, 107}_2
c    -b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_1
c    -b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨  b^{10, 107}_0
c  in DIMACS:
-11351 -11352  11353 -1060  11354 0
-11351 -11352  11353 -1060 -11355 0
-11351 -11352  11353 -1060  11356 0

c  -1+1 --> 0
c    ( b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0 ∧  p_1060) -> (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧ -b^{10, 107}_0)
c  in CNF:
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_2
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_1
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_0
c  in DIMACS:
-11351  11352 -11353 -1060 -11354 0
-11351  11352 -11353 -1060 -11355 0
-11351  11352 -11353 -1060 -11356 0

c  0+1 --> 1
c    (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧  p_1060) -> (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0)
c  in CNF:
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_2
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_1
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨  b^{10, 107}_0
c  in DIMACS:
 11351  11352  11353 -1060 -11354 0
 11351  11352  11353 -1060 -11355 0
 11351  11352  11353 -1060  11356 0

c  1+1 --> 2
c    (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0 ∧  p_1060) -> (-b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0)
c  in CNF:
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_2
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨  b^{10, 107}_1
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ -p_1060 ∨ -b^{10, 107}_0
c  in DIMACS:
 11351  11352 -11353 -1060 -11354 0
 11351  11352 -11353 -1060  11355 0
 11351  11352 -11353 -1060 -11356 0

c  2+1 --> break 
c    (-b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 11351 -11352  11353 -1060 1162 0


c  2-1 --> 1
c    (-b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧ -p_1060) -> (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0)
c  in CNF:
c     b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_2
c     b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_1
c     b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨  b^{10, 107}_0
c  in DIMACS:
 11351 -11352  11353  1060 -11354 0
 11351 -11352  11353  1060 -11355 0
 11351 -11352  11353  1060  11356 0

c  1-1 --> 0
c    (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0 ∧ -p_1060) -> (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧ -b^{10, 107}_0)
c  in CNF:
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_2
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_1
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_0
c  in DIMACS:
 11351  11352 -11353  1060 -11354 0
 11351  11352 -11353  1060 -11355 0
 11351  11352 -11353  1060 -11356 0

c  0-1 --> -1
c    (-b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧ -p_1060) -> ( b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0)
c  in CNF:
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨  b^{10, 107}_2
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_1
c     b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨  b^{10, 107}_0
c  in DIMACS:
 11351  11352  11353  1060  11354 0
 11351  11352  11353  1060 -11355 0
 11351  11352  11353  1060  11356 0

c  -1-1 --> -2
c    ( b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧  b^{10, 106}_0 ∧ -p_1060) -> ( b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0)
c  in CNF:
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨  b^{10, 107}_2
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨  b^{10, 107}_1
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨  p_1060 ∨ -b^{10, 107}_0
c  in DIMACS:
-11351  11352 -11353  1060  11354 0
-11351  11352 -11353  1060  11355 0
-11351  11352 -11353  1060 -11356 0

c  -2-1 --> break 
c    ( b^{10, 106}_2 ∧  b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨  b^{10, 106}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-11351 -11352  11353  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 106}_2 ∧ -b^{10, 106}_1 ∧ -b^{10, 106}_0 ∧ true) 
c  in CNF:
c    -b^{10, 106}_2 ∨  b^{10, 106}_1 ∨  b^{10, 106}_0 ∨ false 
c  in DIMACS:
-11351  11352  11353  0

c  3 does not represent an automaton state.
c    -(-b^{10, 106}_2 ∧  b^{10, 106}_1 ∧  b^{10, 106}_0 ∧ true) 
c  in CNF:
c     b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ false 
c  in DIMACS:
 11351 -11352 -11353  0
c  -3 does not represent an automaton state.
c    -( b^{10, 106}_2 ∧  b^{10, 106}_1 ∧  b^{10, 106}_0 ∧ true) 
c  in CNF:
c    -b^{10, 106}_2 ∨ -b^{10, 106}_1 ∨ -b^{10, 106}_0 ∨ false 
c  in DIMACS:
-11351 -11352 -11353  0

c i = 107
c  -2+1 --> -1
c    ( b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧  p_1070) -> ( b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0)
c  in CNF:
c    -b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨  b^{10, 108}_2
c    -b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_1
c    -b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨  b^{10, 108}_0
c  in DIMACS:
-11354 -11355  11356 -1070  11357 0
-11354 -11355  11356 -1070 -11358 0
-11354 -11355  11356 -1070  11359 0

c  -1+1 --> 0
c    ( b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0 ∧  p_1070) -> (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧ -b^{10, 108}_0)
c  in CNF:
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_2
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_1
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_0
c  in DIMACS:
-11354  11355 -11356 -1070 -11357 0
-11354  11355 -11356 -1070 -11358 0
-11354  11355 -11356 -1070 -11359 0

c  0+1 --> 1
c    (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧  p_1070) -> (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0)
c  in CNF:
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_2
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_1
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨  b^{10, 108}_0
c  in DIMACS:
 11354  11355  11356 -1070 -11357 0
 11354  11355  11356 -1070 -11358 0
 11354  11355  11356 -1070  11359 0

c  1+1 --> 2
c    (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0 ∧  p_1070) -> (-b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0)
c  in CNF:
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_2
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨  b^{10, 108}_1
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ -p_1070 ∨ -b^{10, 108}_0
c  in DIMACS:
 11354  11355 -11356 -1070 -11357 0
 11354  11355 -11356 -1070  11358 0
 11354  11355 -11356 -1070 -11359 0

c  2+1 --> break 
c    (-b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 11354 -11355  11356 -1070 1162 0


c  2-1 --> 1
c    (-b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧ -p_1070) -> (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0)
c  in CNF:
c     b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_2
c     b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_1
c     b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨  b^{10, 108}_0
c  in DIMACS:
 11354 -11355  11356  1070 -11357 0
 11354 -11355  11356  1070 -11358 0
 11354 -11355  11356  1070  11359 0

c  1-1 --> 0
c    (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0 ∧ -p_1070) -> (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧ -b^{10, 108}_0)
c  in CNF:
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_2
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_1
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_0
c  in DIMACS:
 11354  11355 -11356  1070 -11357 0
 11354  11355 -11356  1070 -11358 0
 11354  11355 -11356  1070 -11359 0

c  0-1 --> -1
c    (-b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧ -p_1070) -> ( b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0)
c  in CNF:
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨  b^{10, 108}_2
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_1
c     b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨  b^{10, 108}_0
c  in DIMACS:
 11354  11355  11356  1070  11357 0
 11354  11355  11356  1070 -11358 0
 11354  11355  11356  1070  11359 0

c  -1-1 --> -2
c    ( b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧  b^{10, 107}_0 ∧ -p_1070) -> ( b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0)
c  in CNF:
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨  b^{10, 108}_2
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨  b^{10, 108}_1
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨  p_1070 ∨ -b^{10, 108}_0
c  in DIMACS:
-11354  11355 -11356  1070  11357 0
-11354  11355 -11356  1070  11358 0
-11354  11355 -11356  1070 -11359 0

c  -2-1 --> break 
c    ( b^{10, 107}_2 ∧  b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨  b^{10, 107}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-11354 -11355  11356  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 107}_2 ∧ -b^{10, 107}_1 ∧ -b^{10, 107}_0 ∧ true) 
c  in CNF:
c    -b^{10, 107}_2 ∨  b^{10, 107}_1 ∨  b^{10, 107}_0 ∨ false 
c  in DIMACS:
-11354  11355  11356  0

c  3 does not represent an automaton state.
c    -(-b^{10, 107}_2 ∧  b^{10, 107}_1 ∧  b^{10, 107}_0 ∧ true) 
c  in CNF:
c     b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ false 
c  in DIMACS:
 11354 -11355 -11356  0
c  -3 does not represent an automaton state.
c    -( b^{10, 107}_2 ∧  b^{10, 107}_1 ∧  b^{10, 107}_0 ∧ true) 
c  in CNF:
c    -b^{10, 107}_2 ∨ -b^{10, 107}_1 ∨ -b^{10, 107}_0 ∨ false 
c  in DIMACS:
-11354 -11355 -11356  0

c i = 108
c  -2+1 --> -1
c    ( b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧  p_1080) -> ( b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0)
c  in CNF:
c    -b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨  b^{10, 109}_2
c    -b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_1
c    -b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨  b^{10, 109}_0
c  in DIMACS:
-11357 -11358  11359 -1080  11360 0
-11357 -11358  11359 -1080 -11361 0
-11357 -11358  11359 -1080  11362 0

c  -1+1 --> 0
c    ( b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0 ∧  p_1080) -> (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧ -b^{10, 109}_0)
c  in CNF:
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_2
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_1
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_0
c  in DIMACS:
-11357  11358 -11359 -1080 -11360 0
-11357  11358 -11359 -1080 -11361 0
-11357  11358 -11359 -1080 -11362 0

c  0+1 --> 1
c    (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧  p_1080) -> (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0)
c  in CNF:
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_2
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_1
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨  b^{10, 109}_0
c  in DIMACS:
 11357  11358  11359 -1080 -11360 0
 11357  11358  11359 -1080 -11361 0
 11357  11358  11359 -1080  11362 0

c  1+1 --> 2
c    (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0 ∧  p_1080) -> (-b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0)
c  in CNF:
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_2
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨  b^{10, 109}_1
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ -p_1080 ∨ -b^{10, 109}_0
c  in DIMACS:
 11357  11358 -11359 -1080 -11360 0
 11357  11358 -11359 -1080  11361 0
 11357  11358 -11359 -1080 -11362 0

c  2+1 --> break 
c    (-b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 11357 -11358  11359 -1080 1162 0


c  2-1 --> 1
c    (-b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧ -p_1080) -> (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0)
c  in CNF:
c     b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_2
c     b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_1
c     b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨  b^{10, 109}_0
c  in DIMACS:
 11357 -11358  11359  1080 -11360 0
 11357 -11358  11359  1080 -11361 0
 11357 -11358  11359  1080  11362 0

c  1-1 --> 0
c    (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0 ∧ -p_1080) -> (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧ -b^{10, 109}_0)
c  in CNF:
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_2
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_1
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_0
c  in DIMACS:
 11357  11358 -11359  1080 -11360 0
 11357  11358 -11359  1080 -11361 0
 11357  11358 -11359  1080 -11362 0

c  0-1 --> -1
c    (-b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧ -p_1080) -> ( b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0)
c  in CNF:
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨  b^{10, 109}_2
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_1
c     b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨  b^{10, 109}_0
c  in DIMACS:
 11357  11358  11359  1080  11360 0
 11357  11358  11359  1080 -11361 0
 11357  11358  11359  1080  11362 0

c  -1-1 --> -2
c    ( b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧  b^{10, 108}_0 ∧ -p_1080) -> ( b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0)
c  in CNF:
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨  b^{10, 109}_2
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨  b^{10, 109}_1
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨  p_1080 ∨ -b^{10, 109}_0
c  in DIMACS:
-11357  11358 -11359  1080  11360 0
-11357  11358 -11359  1080  11361 0
-11357  11358 -11359  1080 -11362 0

c  -2-1 --> break 
c    ( b^{10, 108}_2 ∧  b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨  b^{10, 108}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-11357 -11358  11359  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 108}_2 ∧ -b^{10, 108}_1 ∧ -b^{10, 108}_0 ∧ true) 
c  in CNF:
c    -b^{10, 108}_2 ∨  b^{10, 108}_1 ∨  b^{10, 108}_0 ∨ false 
c  in DIMACS:
-11357  11358  11359  0

c  3 does not represent an automaton state.
c    -(-b^{10, 108}_2 ∧  b^{10, 108}_1 ∧  b^{10, 108}_0 ∧ true) 
c  in CNF:
c     b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ false 
c  in DIMACS:
 11357 -11358 -11359  0
c  -3 does not represent an automaton state.
c    -( b^{10, 108}_2 ∧  b^{10, 108}_1 ∧  b^{10, 108}_0 ∧ true) 
c  in CNF:
c    -b^{10, 108}_2 ∨ -b^{10, 108}_1 ∨ -b^{10, 108}_0 ∨ false 
c  in DIMACS:
-11357 -11358 -11359  0

c i = 109
c  -2+1 --> -1
c    ( b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧  p_1090) -> ( b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0)
c  in CNF:
c    -b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨  b^{10, 110}_2
c    -b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_1
c    -b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨  b^{10, 110}_0
c  in DIMACS:
-11360 -11361  11362 -1090  11363 0
-11360 -11361  11362 -1090 -11364 0
-11360 -11361  11362 -1090  11365 0

c  -1+1 --> 0
c    ( b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0 ∧  p_1090) -> (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧ -b^{10, 110}_0)
c  in CNF:
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_2
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_1
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_0
c  in DIMACS:
-11360  11361 -11362 -1090 -11363 0
-11360  11361 -11362 -1090 -11364 0
-11360  11361 -11362 -1090 -11365 0

c  0+1 --> 1
c    (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧  p_1090) -> (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0)
c  in CNF:
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_2
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_1
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨  b^{10, 110}_0
c  in DIMACS:
 11360  11361  11362 -1090 -11363 0
 11360  11361  11362 -1090 -11364 0
 11360  11361  11362 -1090  11365 0

c  1+1 --> 2
c    (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0 ∧  p_1090) -> (-b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0)
c  in CNF:
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_2
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨  b^{10, 110}_1
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ -p_1090 ∨ -b^{10, 110}_0
c  in DIMACS:
 11360  11361 -11362 -1090 -11363 0
 11360  11361 -11362 -1090  11364 0
 11360  11361 -11362 -1090 -11365 0

c  2+1 --> break 
c    (-b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 11360 -11361  11362 -1090 1162 0


c  2-1 --> 1
c    (-b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧ -p_1090) -> (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0)
c  in CNF:
c     b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_2
c     b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_1
c     b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨  b^{10, 110}_0
c  in DIMACS:
 11360 -11361  11362  1090 -11363 0
 11360 -11361  11362  1090 -11364 0
 11360 -11361  11362  1090  11365 0

c  1-1 --> 0
c    (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0 ∧ -p_1090) -> (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧ -b^{10, 110}_0)
c  in CNF:
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_2
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_1
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_0
c  in DIMACS:
 11360  11361 -11362  1090 -11363 0
 11360  11361 -11362  1090 -11364 0
 11360  11361 -11362  1090 -11365 0

c  0-1 --> -1
c    (-b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧ -p_1090) -> ( b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0)
c  in CNF:
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨  b^{10, 110}_2
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_1
c     b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨  b^{10, 110}_0
c  in DIMACS:
 11360  11361  11362  1090  11363 0
 11360  11361  11362  1090 -11364 0
 11360  11361  11362  1090  11365 0

c  -1-1 --> -2
c    ( b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧  b^{10, 109}_0 ∧ -p_1090) -> ( b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0)
c  in CNF:
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨  b^{10, 110}_2
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨  b^{10, 110}_1
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨  p_1090 ∨ -b^{10, 110}_0
c  in DIMACS:
-11360  11361 -11362  1090  11363 0
-11360  11361 -11362  1090  11364 0
-11360  11361 -11362  1090 -11365 0

c  -2-1 --> break 
c    ( b^{10, 109}_2 ∧  b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨  b^{10, 109}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-11360 -11361  11362  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 109}_2 ∧ -b^{10, 109}_1 ∧ -b^{10, 109}_0 ∧ true) 
c  in CNF:
c    -b^{10, 109}_2 ∨  b^{10, 109}_1 ∨  b^{10, 109}_0 ∨ false 
c  in DIMACS:
-11360  11361  11362  0

c  3 does not represent an automaton state.
c    -(-b^{10, 109}_2 ∧  b^{10, 109}_1 ∧  b^{10, 109}_0 ∧ true) 
c  in CNF:
c     b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ false 
c  in DIMACS:
 11360 -11361 -11362  0
c  -3 does not represent an automaton state.
c    -( b^{10, 109}_2 ∧  b^{10, 109}_1 ∧  b^{10, 109}_0 ∧ true) 
c  in CNF:
c    -b^{10, 109}_2 ∨ -b^{10, 109}_1 ∨ -b^{10, 109}_0 ∨ false 
c  in DIMACS:
-11360 -11361 -11362  0

c i = 110
c  -2+1 --> -1
c    ( b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧  p_1100) -> ( b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0)
c  in CNF:
c    -b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨  b^{10, 111}_2
c    -b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_1
c    -b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨  b^{10, 111}_0
c  in DIMACS:
-11363 -11364  11365 -1100  11366 0
-11363 -11364  11365 -1100 -11367 0
-11363 -11364  11365 -1100  11368 0

c  -1+1 --> 0
c    ( b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0 ∧  p_1100) -> (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧ -b^{10, 111}_0)
c  in CNF:
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_2
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_1
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_0
c  in DIMACS:
-11363  11364 -11365 -1100 -11366 0
-11363  11364 -11365 -1100 -11367 0
-11363  11364 -11365 -1100 -11368 0

c  0+1 --> 1
c    (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧  p_1100) -> (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0)
c  in CNF:
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_2
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_1
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨  b^{10, 111}_0
c  in DIMACS:
 11363  11364  11365 -1100 -11366 0
 11363  11364  11365 -1100 -11367 0
 11363  11364  11365 -1100  11368 0

c  1+1 --> 2
c    (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0 ∧  p_1100) -> (-b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0)
c  in CNF:
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_2
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨  b^{10, 111}_1
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ -p_1100 ∨ -b^{10, 111}_0
c  in DIMACS:
 11363  11364 -11365 -1100 -11366 0
 11363  11364 -11365 -1100  11367 0
 11363  11364 -11365 -1100 -11368 0

c  2+1 --> break 
c    (-b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 11363 -11364  11365 -1100 1162 0


c  2-1 --> 1
c    (-b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧ -p_1100) -> (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0)
c  in CNF:
c     b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_2
c     b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_1
c     b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨  b^{10, 111}_0
c  in DIMACS:
 11363 -11364  11365  1100 -11366 0
 11363 -11364  11365  1100 -11367 0
 11363 -11364  11365  1100  11368 0

c  1-1 --> 0
c    (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0 ∧ -p_1100) -> (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧ -b^{10, 111}_0)
c  in CNF:
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_2
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_1
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_0
c  in DIMACS:
 11363  11364 -11365  1100 -11366 0
 11363  11364 -11365  1100 -11367 0
 11363  11364 -11365  1100 -11368 0

c  0-1 --> -1
c    (-b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧ -p_1100) -> ( b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0)
c  in CNF:
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨  b^{10, 111}_2
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_1
c     b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨  b^{10, 111}_0
c  in DIMACS:
 11363  11364  11365  1100  11366 0
 11363  11364  11365  1100 -11367 0
 11363  11364  11365  1100  11368 0

c  -1-1 --> -2
c    ( b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧  b^{10, 110}_0 ∧ -p_1100) -> ( b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0)
c  in CNF:
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨  b^{10, 111}_2
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨  b^{10, 111}_1
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨  p_1100 ∨ -b^{10, 111}_0
c  in DIMACS:
-11363  11364 -11365  1100  11366 0
-11363  11364 -11365  1100  11367 0
-11363  11364 -11365  1100 -11368 0

c  -2-1 --> break 
c    ( b^{10, 110}_2 ∧  b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨  b^{10, 110}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-11363 -11364  11365  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 110}_2 ∧ -b^{10, 110}_1 ∧ -b^{10, 110}_0 ∧ true) 
c  in CNF:
c    -b^{10, 110}_2 ∨  b^{10, 110}_1 ∨  b^{10, 110}_0 ∨ false 
c  in DIMACS:
-11363  11364  11365  0

c  3 does not represent an automaton state.
c    -(-b^{10, 110}_2 ∧  b^{10, 110}_1 ∧  b^{10, 110}_0 ∧ true) 
c  in CNF:
c     b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ false 
c  in DIMACS:
 11363 -11364 -11365  0
c  -3 does not represent an automaton state.
c    -( b^{10, 110}_2 ∧  b^{10, 110}_1 ∧  b^{10, 110}_0 ∧ true) 
c  in CNF:
c    -b^{10, 110}_2 ∨ -b^{10, 110}_1 ∨ -b^{10, 110}_0 ∨ false 
c  in DIMACS:
-11363 -11364 -11365  0

c i = 111
c  -2+1 --> -1
c    ( b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧  p_1110) -> ( b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0)
c  in CNF:
c    -b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨  b^{10, 112}_2
c    -b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_1
c    -b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨  b^{10, 112}_0
c  in DIMACS:
-11366 -11367  11368 -1110  11369 0
-11366 -11367  11368 -1110 -11370 0
-11366 -11367  11368 -1110  11371 0

c  -1+1 --> 0
c    ( b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0 ∧  p_1110) -> (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧ -b^{10, 112}_0)
c  in CNF:
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_2
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_1
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_0
c  in DIMACS:
-11366  11367 -11368 -1110 -11369 0
-11366  11367 -11368 -1110 -11370 0
-11366  11367 -11368 -1110 -11371 0

c  0+1 --> 1
c    (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧  p_1110) -> (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0)
c  in CNF:
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_2
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_1
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨  b^{10, 112}_0
c  in DIMACS:
 11366  11367  11368 -1110 -11369 0
 11366  11367  11368 -1110 -11370 0
 11366  11367  11368 -1110  11371 0

c  1+1 --> 2
c    (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0 ∧  p_1110) -> (-b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0)
c  in CNF:
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_2
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨  b^{10, 112}_1
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ -p_1110 ∨ -b^{10, 112}_0
c  in DIMACS:
 11366  11367 -11368 -1110 -11369 0
 11366  11367 -11368 -1110  11370 0
 11366  11367 -11368 -1110 -11371 0

c  2+1 --> break 
c    (-b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 11366 -11367  11368 -1110 1162 0


c  2-1 --> 1
c    (-b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧ -p_1110) -> (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0)
c  in CNF:
c     b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_2
c     b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_1
c     b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨  b^{10, 112}_0
c  in DIMACS:
 11366 -11367  11368  1110 -11369 0
 11366 -11367  11368  1110 -11370 0
 11366 -11367  11368  1110  11371 0

c  1-1 --> 0
c    (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0 ∧ -p_1110) -> (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧ -b^{10, 112}_0)
c  in CNF:
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_2
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_1
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_0
c  in DIMACS:
 11366  11367 -11368  1110 -11369 0
 11366  11367 -11368  1110 -11370 0
 11366  11367 -11368  1110 -11371 0

c  0-1 --> -1
c    (-b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧ -p_1110) -> ( b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0)
c  in CNF:
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨  b^{10, 112}_2
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_1
c     b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨  b^{10, 112}_0
c  in DIMACS:
 11366  11367  11368  1110  11369 0
 11366  11367  11368  1110 -11370 0
 11366  11367  11368  1110  11371 0

c  -1-1 --> -2
c    ( b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧  b^{10, 111}_0 ∧ -p_1110) -> ( b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0)
c  in CNF:
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨  b^{10, 112}_2
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨  b^{10, 112}_1
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨  p_1110 ∨ -b^{10, 112}_0
c  in DIMACS:
-11366  11367 -11368  1110  11369 0
-11366  11367 -11368  1110  11370 0
-11366  11367 -11368  1110 -11371 0

c  -2-1 --> break 
c    ( b^{10, 111}_2 ∧  b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨  b^{10, 111}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-11366 -11367  11368  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 111}_2 ∧ -b^{10, 111}_1 ∧ -b^{10, 111}_0 ∧ true) 
c  in CNF:
c    -b^{10, 111}_2 ∨  b^{10, 111}_1 ∨  b^{10, 111}_0 ∨ false 
c  in DIMACS:
-11366  11367  11368  0

c  3 does not represent an automaton state.
c    -(-b^{10, 111}_2 ∧  b^{10, 111}_1 ∧  b^{10, 111}_0 ∧ true) 
c  in CNF:
c     b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ false 
c  in DIMACS:
 11366 -11367 -11368  0
c  -3 does not represent an automaton state.
c    -( b^{10, 111}_2 ∧  b^{10, 111}_1 ∧  b^{10, 111}_0 ∧ true) 
c  in CNF:
c    -b^{10, 111}_2 ∨ -b^{10, 111}_1 ∨ -b^{10, 111}_0 ∨ false 
c  in DIMACS:
-11366 -11367 -11368  0

c i = 112
c  -2+1 --> -1
c    ( b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧  p_1120) -> ( b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0)
c  in CNF:
c    -b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨  b^{10, 113}_2
c    -b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_1
c    -b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨  b^{10, 113}_0
c  in DIMACS:
-11369 -11370  11371 -1120  11372 0
-11369 -11370  11371 -1120 -11373 0
-11369 -11370  11371 -1120  11374 0

c  -1+1 --> 0
c    ( b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0 ∧  p_1120) -> (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧ -b^{10, 113}_0)
c  in CNF:
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_2
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_1
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_0
c  in DIMACS:
-11369  11370 -11371 -1120 -11372 0
-11369  11370 -11371 -1120 -11373 0
-11369  11370 -11371 -1120 -11374 0

c  0+1 --> 1
c    (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧  p_1120) -> (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0)
c  in CNF:
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_2
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_1
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨  b^{10, 113}_0
c  in DIMACS:
 11369  11370  11371 -1120 -11372 0
 11369  11370  11371 -1120 -11373 0
 11369  11370  11371 -1120  11374 0

c  1+1 --> 2
c    (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0 ∧  p_1120) -> (-b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0)
c  in CNF:
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_2
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨  b^{10, 113}_1
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ -p_1120 ∨ -b^{10, 113}_0
c  in DIMACS:
 11369  11370 -11371 -1120 -11372 0
 11369  11370 -11371 -1120  11373 0
 11369  11370 -11371 -1120 -11374 0

c  2+1 --> break 
c    (-b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 11369 -11370  11371 -1120 1162 0


c  2-1 --> 1
c    (-b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧ -p_1120) -> (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0)
c  in CNF:
c     b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_2
c     b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_1
c     b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨  b^{10, 113}_0
c  in DIMACS:
 11369 -11370  11371  1120 -11372 0
 11369 -11370  11371  1120 -11373 0
 11369 -11370  11371  1120  11374 0

c  1-1 --> 0
c    (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0 ∧ -p_1120) -> (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧ -b^{10, 113}_0)
c  in CNF:
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_2
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_1
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_0
c  in DIMACS:
 11369  11370 -11371  1120 -11372 0
 11369  11370 -11371  1120 -11373 0
 11369  11370 -11371  1120 -11374 0

c  0-1 --> -1
c    (-b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧ -p_1120) -> ( b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0)
c  in CNF:
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨  b^{10, 113}_2
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_1
c     b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨  b^{10, 113}_0
c  in DIMACS:
 11369  11370  11371  1120  11372 0
 11369  11370  11371  1120 -11373 0
 11369  11370  11371  1120  11374 0

c  -1-1 --> -2
c    ( b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧  b^{10, 112}_0 ∧ -p_1120) -> ( b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0)
c  in CNF:
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨  b^{10, 113}_2
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨  b^{10, 113}_1
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨  p_1120 ∨ -b^{10, 113}_0
c  in DIMACS:
-11369  11370 -11371  1120  11372 0
-11369  11370 -11371  1120  11373 0
-11369  11370 -11371  1120 -11374 0

c  -2-1 --> break 
c    ( b^{10, 112}_2 ∧  b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨  b^{10, 112}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-11369 -11370  11371  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 112}_2 ∧ -b^{10, 112}_1 ∧ -b^{10, 112}_0 ∧ true) 
c  in CNF:
c    -b^{10, 112}_2 ∨  b^{10, 112}_1 ∨  b^{10, 112}_0 ∨ false 
c  in DIMACS:
-11369  11370  11371  0

c  3 does not represent an automaton state.
c    -(-b^{10, 112}_2 ∧  b^{10, 112}_1 ∧  b^{10, 112}_0 ∧ true) 
c  in CNF:
c     b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ false 
c  in DIMACS:
 11369 -11370 -11371  0
c  -3 does not represent an automaton state.
c    -( b^{10, 112}_2 ∧  b^{10, 112}_1 ∧  b^{10, 112}_0 ∧ true) 
c  in CNF:
c    -b^{10, 112}_2 ∨ -b^{10, 112}_1 ∨ -b^{10, 112}_0 ∨ false 
c  in DIMACS:
-11369 -11370 -11371  0

c i = 113
c  -2+1 --> -1
c    ( b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧  p_1130) -> ( b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0)
c  in CNF:
c    -b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨  b^{10, 114}_2
c    -b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_1
c    -b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨  b^{10, 114}_0
c  in DIMACS:
-11372 -11373  11374 -1130  11375 0
-11372 -11373  11374 -1130 -11376 0
-11372 -11373  11374 -1130  11377 0

c  -1+1 --> 0
c    ( b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0 ∧  p_1130) -> (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧ -b^{10, 114}_0)
c  in CNF:
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_2
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_1
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_0
c  in DIMACS:
-11372  11373 -11374 -1130 -11375 0
-11372  11373 -11374 -1130 -11376 0
-11372  11373 -11374 -1130 -11377 0

c  0+1 --> 1
c    (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧  p_1130) -> (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0)
c  in CNF:
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_2
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_1
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨  b^{10, 114}_0
c  in DIMACS:
 11372  11373  11374 -1130 -11375 0
 11372  11373  11374 -1130 -11376 0
 11372  11373  11374 -1130  11377 0

c  1+1 --> 2
c    (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0 ∧  p_1130) -> (-b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0)
c  in CNF:
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_2
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨  b^{10, 114}_1
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ -p_1130 ∨ -b^{10, 114}_0
c  in DIMACS:
 11372  11373 -11374 -1130 -11375 0
 11372  11373 -11374 -1130  11376 0
 11372  11373 -11374 -1130 -11377 0

c  2+1 --> break 
c    (-b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 11372 -11373  11374 -1130 1162 0


c  2-1 --> 1
c    (-b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧ -p_1130) -> (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0)
c  in CNF:
c     b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_2
c     b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_1
c     b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨  b^{10, 114}_0
c  in DIMACS:
 11372 -11373  11374  1130 -11375 0
 11372 -11373  11374  1130 -11376 0
 11372 -11373  11374  1130  11377 0

c  1-1 --> 0
c    (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0 ∧ -p_1130) -> (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧ -b^{10, 114}_0)
c  in CNF:
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_2
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_1
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_0
c  in DIMACS:
 11372  11373 -11374  1130 -11375 0
 11372  11373 -11374  1130 -11376 0
 11372  11373 -11374  1130 -11377 0

c  0-1 --> -1
c    (-b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧ -p_1130) -> ( b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0)
c  in CNF:
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨  b^{10, 114}_2
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_1
c     b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨  b^{10, 114}_0
c  in DIMACS:
 11372  11373  11374  1130  11375 0
 11372  11373  11374  1130 -11376 0
 11372  11373  11374  1130  11377 0

c  -1-1 --> -2
c    ( b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧  b^{10, 113}_0 ∧ -p_1130) -> ( b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0)
c  in CNF:
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨  b^{10, 114}_2
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨  b^{10, 114}_1
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨  p_1130 ∨ -b^{10, 114}_0
c  in DIMACS:
-11372  11373 -11374  1130  11375 0
-11372  11373 -11374  1130  11376 0
-11372  11373 -11374  1130 -11377 0

c  -2-1 --> break 
c    ( b^{10, 113}_2 ∧  b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨  b^{10, 113}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-11372 -11373  11374  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 113}_2 ∧ -b^{10, 113}_1 ∧ -b^{10, 113}_0 ∧ true) 
c  in CNF:
c    -b^{10, 113}_2 ∨  b^{10, 113}_1 ∨  b^{10, 113}_0 ∨ false 
c  in DIMACS:
-11372  11373  11374  0

c  3 does not represent an automaton state.
c    -(-b^{10, 113}_2 ∧  b^{10, 113}_1 ∧  b^{10, 113}_0 ∧ true) 
c  in CNF:
c     b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ false 
c  in DIMACS:
 11372 -11373 -11374  0
c  -3 does not represent an automaton state.
c    -( b^{10, 113}_2 ∧  b^{10, 113}_1 ∧  b^{10, 113}_0 ∧ true) 
c  in CNF:
c    -b^{10, 113}_2 ∨ -b^{10, 113}_1 ∨ -b^{10, 113}_0 ∨ false 
c  in DIMACS:
-11372 -11373 -11374  0

c i = 114
c  -2+1 --> -1
c    ( b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧  p_1140) -> ( b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0)
c  in CNF:
c    -b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨  b^{10, 115}_2
c    -b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_1
c    -b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨  b^{10, 115}_0
c  in DIMACS:
-11375 -11376  11377 -1140  11378 0
-11375 -11376  11377 -1140 -11379 0
-11375 -11376  11377 -1140  11380 0

c  -1+1 --> 0
c    ( b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0 ∧  p_1140) -> (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧ -b^{10, 115}_0)
c  in CNF:
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_2
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_1
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_0
c  in DIMACS:
-11375  11376 -11377 -1140 -11378 0
-11375  11376 -11377 -1140 -11379 0
-11375  11376 -11377 -1140 -11380 0

c  0+1 --> 1
c    (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧  p_1140) -> (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0)
c  in CNF:
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_2
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_1
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨  b^{10, 115}_0
c  in DIMACS:
 11375  11376  11377 -1140 -11378 0
 11375  11376  11377 -1140 -11379 0
 11375  11376  11377 -1140  11380 0

c  1+1 --> 2
c    (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0 ∧  p_1140) -> (-b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0)
c  in CNF:
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_2
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨  b^{10, 115}_1
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ -p_1140 ∨ -b^{10, 115}_0
c  in DIMACS:
 11375  11376 -11377 -1140 -11378 0
 11375  11376 -11377 -1140  11379 0
 11375  11376 -11377 -1140 -11380 0

c  2+1 --> break 
c    (-b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 11375 -11376  11377 -1140 1162 0


c  2-1 --> 1
c    (-b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧ -p_1140) -> (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0)
c  in CNF:
c     b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_2
c     b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_1
c     b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨  b^{10, 115}_0
c  in DIMACS:
 11375 -11376  11377  1140 -11378 0
 11375 -11376  11377  1140 -11379 0
 11375 -11376  11377  1140  11380 0

c  1-1 --> 0
c    (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0 ∧ -p_1140) -> (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧ -b^{10, 115}_0)
c  in CNF:
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_2
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_1
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_0
c  in DIMACS:
 11375  11376 -11377  1140 -11378 0
 11375  11376 -11377  1140 -11379 0
 11375  11376 -11377  1140 -11380 0

c  0-1 --> -1
c    (-b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧ -p_1140) -> ( b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0)
c  in CNF:
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨  b^{10, 115}_2
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_1
c     b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨  b^{10, 115}_0
c  in DIMACS:
 11375  11376  11377  1140  11378 0
 11375  11376  11377  1140 -11379 0
 11375  11376  11377  1140  11380 0

c  -1-1 --> -2
c    ( b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧  b^{10, 114}_0 ∧ -p_1140) -> ( b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0)
c  in CNF:
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨  b^{10, 115}_2
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨  b^{10, 115}_1
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨  p_1140 ∨ -b^{10, 115}_0
c  in DIMACS:
-11375  11376 -11377  1140  11378 0
-11375  11376 -11377  1140  11379 0
-11375  11376 -11377  1140 -11380 0

c  -2-1 --> break 
c    ( b^{10, 114}_2 ∧  b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨  b^{10, 114}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-11375 -11376  11377  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 114}_2 ∧ -b^{10, 114}_1 ∧ -b^{10, 114}_0 ∧ true) 
c  in CNF:
c    -b^{10, 114}_2 ∨  b^{10, 114}_1 ∨  b^{10, 114}_0 ∨ false 
c  in DIMACS:
-11375  11376  11377  0

c  3 does not represent an automaton state.
c    -(-b^{10, 114}_2 ∧  b^{10, 114}_1 ∧  b^{10, 114}_0 ∧ true) 
c  in CNF:
c     b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ false 
c  in DIMACS:
 11375 -11376 -11377  0
c  -3 does not represent an automaton state.
c    -( b^{10, 114}_2 ∧  b^{10, 114}_1 ∧  b^{10, 114}_0 ∧ true) 
c  in CNF:
c    -b^{10, 114}_2 ∨ -b^{10, 114}_1 ∨ -b^{10, 114}_0 ∨ false 
c  in DIMACS:
-11375 -11376 -11377  0

c i = 115
c  -2+1 --> -1
c    ( b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧  p_1150) -> ( b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0)
c  in CNF:
c    -b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨  b^{10, 116}_2
c    -b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_1
c    -b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨  b^{10, 116}_0
c  in DIMACS:
-11378 -11379  11380 -1150  11381 0
-11378 -11379  11380 -1150 -11382 0
-11378 -11379  11380 -1150  11383 0

c  -1+1 --> 0
c    ( b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0 ∧  p_1150) -> (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧ -b^{10, 116}_0)
c  in CNF:
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_2
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_1
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_0
c  in DIMACS:
-11378  11379 -11380 -1150 -11381 0
-11378  11379 -11380 -1150 -11382 0
-11378  11379 -11380 -1150 -11383 0

c  0+1 --> 1
c    (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧  p_1150) -> (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0)
c  in CNF:
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_2
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_1
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨  b^{10, 116}_0
c  in DIMACS:
 11378  11379  11380 -1150 -11381 0
 11378  11379  11380 -1150 -11382 0
 11378  11379  11380 -1150  11383 0

c  1+1 --> 2
c    (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0 ∧  p_1150) -> (-b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0)
c  in CNF:
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_2
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨  b^{10, 116}_1
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ -p_1150 ∨ -b^{10, 116}_0
c  in DIMACS:
 11378  11379 -11380 -1150 -11381 0
 11378  11379 -11380 -1150  11382 0
 11378  11379 -11380 -1150 -11383 0

c  2+1 --> break 
c    (-b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 11378 -11379  11380 -1150 1162 0


c  2-1 --> 1
c    (-b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧ -p_1150) -> (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0)
c  in CNF:
c     b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_2
c     b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_1
c     b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨  b^{10, 116}_0
c  in DIMACS:
 11378 -11379  11380  1150 -11381 0
 11378 -11379  11380  1150 -11382 0
 11378 -11379  11380  1150  11383 0

c  1-1 --> 0
c    (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0 ∧ -p_1150) -> (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧ -b^{10, 116}_0)
c  in CNF:
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_2
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_1
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_0
c  in DIMACS:
 11378  11379 -11380  1150 -11381 0
 11378  11379 -11380  1150 -11382 0
 11378  11379 -11380  1150 -11383 0

c  0-1 --> -1
c    (-b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧ -p_1150) -> ( b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0)
c  in CNF:
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨  b^{10, 116}_2
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_1
c     b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨  b^{10, 116}_0
c  in DIMACS:
 11378  11379  11380  1150  11381 0
 11378  11379  11380  1150 -11382 0
 11378  11379  11380  1150  11383 0

c  -1-1 --> -2
c    ( b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧  b^{10, 115}_0 ∧ -p_1150) -> ( b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0)
c  in CNF:
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨  b^{10, 116}_2
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨  b^{10, 116}_1
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨  p_1150 ∨ -b^{10, 116}_0
c  in DIMACS:
-11378  11379 -11380  1150  11381 0
-11378  11379 -11380  1150  11382 0
-11378  11379 -11380  1150 -11383 0

c  -2-1 --> break 
c    ( b^{10, 115}_2 ∧  b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨  b^{10, 115}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-11378 -11379  11380  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 115}_2 ∧ -b^{10, 115}_1 ∧ -b^{10, 115}_0 ∧ true) 
c  in CNF:
c    -b^{10, 115}_2 ∨  b^{10, 115}_1 ∨  b^{10, 115}_0 ∨ false 
c  in DIMACS:
-11378  11379  11380  0

c  3 does not represent an automaton state.
c    -(-b^{10, 115}_2 ∧  b^{10, 115}_1 ∧  b^{10, 115}_0 ∧ true) 
c  in CNF:
c     b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ false 
c  in DIMACS:
 11378 -11379 -11380  0
c  -3 does not represent an automaton state.
c    -( b^{10, 115}_2 ∧  b^{10, 115}_1 ∧  b^{10, 115}_0 ∧ true) 
c  in CNF:
c    -b^{10, 115}_2 ∨ -b^{10, 115}_1 ∨ -b^{10, 115}_0 ∨ false 
c  in DIMACS:
-11378 -11379 -11380  0

c i = 116
c  -2+1 --> -1
c    ( b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧  p_1160) -> ( b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧  b^{10, 117}_0)
c  in CNF:
c    -b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨  b^{10, 117}_2
c    -b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_1
c    -b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨  b^{10, 117}_0
c  in DIMACS:
-11381 -11382  11383 -1160  11384 0
-11381 -11382  11383 -1160 -11385 0
-11381 -11382  11383 -1160  11386 0

c  -1+1 --> 0
c    ( b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0 ∧  p_1160) -> (-b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧ -b^{10, 117}_0)
c  in CNF:
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_2
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_1
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_0
c  in DIMACS:
-11381  11382 -11383 -1160 -11384 0
-11381  11382 -11383 -1160 -11385 0
-11381  11382 -11383 -1160 -11386 0

c  0+1 --> 1
c    (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧  p_1160) -> (-b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧  b^{10, 117}_0)
c  in CNF:
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_2
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_1
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨  b^{10, 117}_0
c  in DIMACS:
 11381  11382  11383 -1160 -11384 0
 11381  11382  11383 -1160 -11385 0
 11381  11382  11383 -1160  11386 0

c  1+1 --> 2
c    (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0 ∧  p_1160) -> (-b^{10, 117}_2 ∧  b^{10, 117}_1 ∧ -b^{10, 117}_0)
c  in CNF:
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_2
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨  b^{10, 117}_1
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ -p_1160 ∨ -b^{10, 117}_0
c  in DIMACS:
 11381  11382 -11383 -1160 -11384 0
 11381  11382 -11383 -1160  11385 0
 11381  11382 -11383 -1160 -11386 0

c  2+1 --> break 
c    (-b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 11381 -11382  11383 -1160 1162 0


c  2-1 --> 1
c    (-b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧ -p_1160) -> (-b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧  b^{10, 117}_0)
c  in CNF:
c     b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_2
c     b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_1
c     b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨  b^{10, 117}_0
c  in DIMACS:
 11381 -11382  11383  1160 -11384 0
 11381 -11382  11383  1160 -11385 0
 11381 -11382  11383  1160  11386 0

c  1-1 --> 0
c    (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0 ∧ -p_1160) -> (-b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧ -b^{10, 117}_0)
c  in CNF:
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_2
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_1
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_0
c  in DIMACS:
 11381  11382 -11383  1160 -11384 0
 11381  11382 -11383  1160 -11385 0
 11381  11382 -11383  1160 -11386 0

c  0-1 --> -1
c    (-b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧ -p_1160) -> ( b^{10, 117}_2 ∧ -b^{10, 117}_1 ∧  b^{10, 117}_0)
c  in CNF:
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨  b^{10, 117}_2
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_1
c     b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨  b^{10, 117}_0
c  in DIMACS:
 11381  11382  11383  1160  11384 0
 11381  11382  11383  1160 -11385 0
 11381  11382  11383  1160  11386 0

c  -1-1 --> -2
c    ( b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧  b^{10, 116}_0 ∧ -p_1160) -> ( b^{10, 117}_2 ∧  b^{10, 117}_1 ∧ -b^{10, 117}_0)
c  in CNF:
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨  b^{10, 117}_2
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨  b^{10, 117}_1
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨  p_1160 ∨ -b^{10, 117}_0
c  in DIMACS:
-11381  11382 -11383  1160  11384 0
-11381  11382 -11383  1160  11385 0
-11381  11382 -11383  1160 -11386 0

c  -2-1 --> break 
c    ( b^{10, 116}_2 ∧  b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨  b^{10, 116}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-11381 -11382  11383  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{10, 116}_2 ∧ -b^{10, 116}_1 ∧ -b^{10, 116}_0 ∧ true) 
c  in CNF:
c    -b^{10, 116}_2 ∨  b^{10, 116}_1 ∨  b^{10, 116}_0 ∨ false 
c  in DIMACS:
-11381  11382  11383  0

c  3 does not represent an automaton state.
c    -(-b^{10, 116}_2 ∧  b^{10, 116}_1 ∧  b^{10, 116}_0 ∧ true) 
c  in CNF:
c     b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ false 
c  in DIMACS:
 11381 -11382 -11383  0
c  -3 does not represent an automaton state.
c    -( b^{10, 116}_2 ∧  b^{10, 116}_1 ∧  b^{10, 116}_0 ∧ true) 
c  in CNF:
c    -b^{10, 116}_2 ∨ -b^{10, 116}_1 ∨ -b^{10, 116}_0 ∨ false 
c  in DIMACS:
-11381 -11382 -11383  0

c INIT for k = 11
c    -b^{11, 1}_2
c    -b^{11, 1}_1
c    -b^{11, 1}_0
c  in DIMACS:
-11387 0
-11388 0
-11389 0

c Transitions for k = 11
c i = 1
c  -2+1 --> -1
c    ( b^{11, 1}_2 ∧  b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧  p_11) -> ( b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0)
c  in CNF:
c    -b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨  b^{11, 2}_2
c    -b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_1
c    -b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨  b^{11, 2}_0
c  in DIMACS:
-11387 -11388  11389 -11  11390 0
-11387 -11388  11389 -11 -11391 0
-11387 -11388  11389 -11  11392 0

c  -1+1 --> 0
c    ( b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧  b^{11, 1}_0 ∧  p_11) -> (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧ -b^{11, 2}_0)
c  in CNF:
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_2
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_1
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_0
c  in DIMACS:
-11387  11388 -11389 -11 -11390 0
-11387  11388 -11389 -11 -11391 0
-11387  11388 -11389 -11 -11392 0

c  0+1 --> 1
c    (-b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧  p_11) -> (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0)
c  in CNF:
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_2
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_1
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨  b^{11, 2}_0
c  in DIMACS:
 11387  11388  11389 -11 -11390 0
 11387  11388  11389 -11 -11391 0
 11387  11388  11389 -11  11392 0

c  1+1 --> 2
c    (-b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧  b^{11, 1}_0 ∧  p_11) -> (-b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0)
c  in CNF:
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_2
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨  b^{11, 2}_1
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ -p_11 ∨ -b^{11, 2}_0
c  in DIMACS:
 11387  11388 -11389 -11 -11390 0
 11387  11388 -11389 -11  11391 0
 11387  11388 -11389 -11 -11392 0

c  2+1 --> break 
c    (-b^{11, 1}_2 ∧  b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧  p_11) -> break
c  in CNF:
c     b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ -p_11 ∨ break
c  in DIMACS:
 11387 -11388  11389 -11 1162 0


c  2-1 --> 1
c    (-b^{11, 1}_2 ∧  b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧ -p_11) -> (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0)
c  in CNF:
c     b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_2
c     b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_1
c     b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨  b^{11, 2}_0
c  in DIMACS:
 11387 -11388  11389  11 -11390 0
 11387 -11388  11389  11 -11391 0
 11387 -11388  11389  11  11392 0

c  1-1 --> 0
c    (-b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧  b^{11, 1}_0 ∧ -p_11) -> (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧ -b^{11, 2}_0)
c  in CNF:
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_2
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_1
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_0
c  in DIMACS:
 11387  11388 -11389  11 -11390 0
 11387  11388 -11389  11 -11391 0
 11387  11388 -11389  11 -11392 0

c  0-1 --> -1
c    (-b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧ -p_11) -> ( b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0)
c  in CNF:
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨  b^{11, 2}_2
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_1
c     b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨  b^{11, 2}_0
c  in DIMACS:
 11387  11388  11389  11  11390 0
 11387  11388  11389  11 -11391 0
 11387  11388  11389  11  11392 0

c  -1-1 --> -2
c    ( b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧  b^{11, 1}_0 ∧ -p_11) -> ( b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0)
c  in CNF:
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨  b^{11, 2}_2
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨  b^{11, 2}_1
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨  p_11 ∨ -b^{11, 2}_0
c  in DIMACS:
-11387  11388 -11389  11  11390 0
-11387  11388 -11389  11  11391 0
-11387  11388 -11389  11 -11392 0

c  -2-1 --> break 
c    ( b^{11, 1}_2 ∧  b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧ -p_11) -> break
c  in CNF:
c    -b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨  b^{11, 1}_0 ∨  p_11 ∨ break
c  in DIMACS:
-11387 -11388  11389  11 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 1}_2 ∧ -b^{11, 1}_1 ∧ -b^{11, 1}_0 ∧ true) 
c  in CNF:
c    -b^{11, 1}_2 ∨  b^{11, 1}_1 ∨  b^{11, 1}_0 ∨ false 
c  in DIMACS:
-11387  11388  11389  0

c  3 does not represent an automaton state.
c    -(-b^{11, 1}_2 ∧  b^{11, 1}_1 ∧  b^{11, 1}_0 ∧ true) 
c  in CNF:
c     b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ false 
c  in DIMACS:
 11387 -11388 -11389  0
c  -3 does not represent an automaton state.
c    -( b^{11, 1}_2 ∧  b^{11, 1}_1 ∧  b^{11, 1}_0 ∧ true) 
c  in CNF:
c    -b^{11, 1}_2 ∨ -b^{11, 1}_1 ∨ -b^{11, 1}_0 ∨ false 
c  in DIMACS:
-11387 -11388 -11389  0

c i = 2
c  -2+1 --> -1
c    ( b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧  p_22) -> ( b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0)
c  in CNF:
c    -b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨  b^{11, 3}_2
c    -b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_1
c    -b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨  b^{11, 3}_0
c  in DIMACS:
-11390 -11391  11392 -22  11393 0
-11390 -11391  11392 -22 -11394 0
-11390 -11391  11392 -22  11395 0

c  -1+1 --> 0
c    ( b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0 ∧  p_22) -> (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧ -b^{11, 3}_0)
c  in CNF:
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_2
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_1
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_0
c  in DIMACS:
-11390  11391 -11392 -22 -11393 0
-11390  11391 -11392 -22 -11394 0
-11390  11391 -11392 -22 -11395 0

c  0+1 --> 1
c    (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧  p_22) -> (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0)
c  in CNF:
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_2
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_1
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨  b^{11, 3}_0
c  in DIMACS:
 11390  11391  11392 -22 -11393 0
 11390  11391  11392 -22 -11394 0
 11390  11391  11392 -22  11395 0

c  1+1 --> 2
c    (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0 ∧  p_22) -> (-b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0)
c  in CNF:
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_2
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨  b^{11, 3}_1
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ -p_22 ∨ -b^{11, 3}_0
c  in DIMACS:
 11390  11391 -11392 -22 -11393 0
 11390  11391 -11392 -22  11394 0
 11390  11391 -11392 -22 -11395 0

c  2+1 --> break 
c    (-b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧  p_22) -> break
c  in CNF:
c     b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ -p_22 ∨ break
c  in DIMACS:
 11390 -11391  11392 -22 1162 0


c  2-1 --> 1
c    (-b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧ -p_22) -> (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0)
c  in CNF:
c     b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_2
c     b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_1
c     b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨  b^{11, 3}_0
c  in DIMACS:
 11390 -11391  11392  22 -11393 0
 11390 -11391  11392  22 -11394 0
 11390 -11391  11392  22  11395 0

c  1-1 --> 0
c    (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0 ∧ -p_22) -> (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧ -b^{11, 3}_0)
c  in CNF:
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_2
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_1
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_0
c  in DIMACS:
 11390  11391 -11392  22 -11393 0
 11390  11391 -11392  22 -11394 0
 11390  11391 -11392  22 -11395 0

c  0-1 --> -1
c    (-b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧ -p_22) -> ( b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0)
c  in CNF:
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨  b^{11, 3}_2
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_1
c     b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨  b^{11, 3}_0
c  in DIMACS:
 11390  11391  11392  22  11393 0
 11390  11391  11392  22 -11394 0
 11390  11391  11392  22  11395 0

c  -1-1 --> -2
c    ( b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧  b^{11, 2}_0 ∧ -p_22) -> ( b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0)
c  in CNF:
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨  b^{11, 3}_2
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨  b^{11, 3}_1
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨  p_22 ∨ -b^{11, 3}_0
c  in DIMACS:
-11390  11391 -11392  22  11393 0
-11390  11391 -11392  22  11394 0
-11390  11391 -11392  22 -11395 0

c  -2-1 --> break 
c    ( b^{11, 2}_2 ∧  b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧ -p_22) -> break
c  in CNF:
c    -b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨  b^{11, 2}_0 ∨  p_22 ∨ break
c  in DIMACS:
-11390 -11391  11392  22 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 2}_2 ∧ -b^{11, 2}_1 ∧ -b^{11, 2}_0 ∧ true) 
c  in CNF:
c    -b^{11, 2}_2 ∨  b^{11, 2}_1 ∨  b^{11, 2}_0 ∨ false 
c  in DIMACS:
-11390  11391  11392  0

c  3 does not represent an automaton state.
c    -(-b^{11, 2}_2 ∧  b^{11, 2}_1 ∧  b^{11, 2}_0 ∧ true) 
c  in CNF:
c     b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ false 
c  in DIMACS:
 11390 -11391 -11392  0
c  -3 does not represent an automaton state.
c    -( b^{11, 2}_2 ∧  b^{11, 2}_1 ∧  b^{11, 2}_0 ∧ true) 
c  in CNF:
c    -b^{11, 2}_2 ∨ -b^{11, 2}_1 ∨ -b^{11, 2}_0 ∨ false 
c  in DIMACS:
-11390 -11391 -11392  0

c i = 3
c  -2+1 --> -1
c    ( b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧  p_33) -> ( b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0)
c  in CNF:
c    -b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨  b^{11, 4}_2
c    -b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_1
c    -b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨  b^{11, 4}_0
c  in DIMACS:
-11393 -11394  11395 -33  11396 0
-11393 -11394  11395 -33 -11397 0
-11393 -11394  11395 -33  11398 0

c  -1+1 --> 0
c    ( b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0 ∧  p_33) -> (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧ -b^{11, 4}_0)
c  in CNF:
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_2
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_1
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_0
c  in DIMACS:
-11393  11394 -11395 -33 -11396 0
-11393  11394 -11395 -33 -11397 0
-11393  11394 -11395 -33 -11398 0

c  0+1 --> 1
c    (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧  p_33) -> (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0)
c  in CNF:
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_2
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_1
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨  b^{11, 4}_0
c  in DIMACS:
 11393  11394  11395 -33 -11396 0
 11393  11394  11395 -33 -11397 0
 11393  11394  11395 -33  11398 0

c  1+1 --> 2
c    (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0 ∧  p_33) -> (-b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0)
c  in CNF:
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_2
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨  b^{11, 4}_1
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ -p_33 ∨ -b^{11, 4}_0
c  in DIMACS:
 11393  11394 -11395 -33 -11396 0
 11393  11394 -11395 -33  11397 0
 11393  11394 -11395 -33 -11398 0

c  2+1 --> break 
c    (-b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧  p_33) -> break
c  in CNF:
c     b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ -p_33 ∨ break
c  in DIMACS:
 11393 -11394  11395 -33 1162 0


c  2-1 --> 1
c    (-b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧ -p_33) -> (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0)
c  in CNF:
c     b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_2
c     b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_1
c     b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨  b^{11, 4}_0
c  in DIMACS:
 11393 -11394  11395  33 -11396 0
 11393 -11394  11395  33 -11397 0
 11393 -11394  11395  33  11398 0

c  1-1 --> 0
c    (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0 ∧ -p_33) -> (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧ -b^{11, 4}_0)
c  in CNF:
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_2
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_1
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_0
c  in DIMACS:
 11393  11394 -11395  33 -11396 0
 11393  11394 -11395  33 -11397 0
 11393  11394 -11395  33 -11398 0

c  0-1 --> -1
c    (-b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧ -p_33) -> ( b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0)
c  in CNF:
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨  b^{11, 4}_2
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_1
c     b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨  b^{11, 4}_0
c  in DIMACS:
 11393  11394  11395  33  11396 0
 11393  11394  11395  33 -11397 0
 11393  11394  11395  33  11398 0

c  -1-1 --> -2
c    ( b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧  b^{11, 3}_0 ∧ -p_33) -> ( b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0)
c  in CNF:
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨  b^{11, 4}_2
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨  b^{11, 4}_1
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨  p_33 ∨ -b^{11, 4}_0
c  in DIMACS:
-11393  11394 -11395  33  11396 0
-11393  11394 -11395  33  11397 0
-11393  11394 -11395  33 -11398 0

c  -2-1 --> break 
c    ( b^{11, 3}_2 ∧  b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧ -p_33) -> break
c  in CNF:
c    -b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨  b^{11, 3}_0 ∨  p_33 ∨ break
c  in DIMACS:
-11393 -11394  11395  33 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 3}_2 ∧ -b^{11, 3}_1 ∧ -b^{11, 3}_0 ∧ true) 
c  in CNF:
c    -b^{11, 3}_2 ∨  b^{11, 3}_1 ∨  b^{11, 3}_0 ∨ false 
c  in DIMACS:
-11393  11394  11395  0

c  3 does not represent an automaton state.
c    -(-b^{11, 3}_2 ∧  b^{11, 3}_1 ∧  b^{11, 3}_0 ∧ true) 
c  in CNF:
c     b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ false 
c  in DIMACS:
 11393 -11394 -11395  0
c  -3 does not represent an automaton state.
c    -( b^{11, 3}_2 ∧  b^{11, 3}_1 ∧  b^{11, 3}_0 ∧ true) 
c  in CNF:
c    -b^{11, 3}_2 ∨ -b^{11, 3}_1 ∨ -b^{11, 3}_0 ∨ false 
c  in DIMACS:
-11393 -11394 -11395  0

c i = 4
c  -2+1 --> -1
c    ( b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧  p_44) -> ( b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0)
c  in CNF:
c    -b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨  b^{11, 5}_2
c    -b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_1
c    -b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨  b^{11, 5}_0
c  in DIMACS:
-11396 -11397  11398 -44  11399 0
-11396 -11397  11398 -44 -11400 0
-11396 -11397  11398 -44  11401 0

c  -1+1 --> 0
c    ( b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0 ∧  p_44) -> (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧ -b^{11, 5}_0)
c  in CNF:
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_2
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_1
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_0
c  in DIMACS:
-11396  11397 -11398 -44 -11399 0
-11396  11397 -11398 -44 -11400 0
-11396  11397 -11398 -44 -11401 0

c  0+1 --> 1
c    (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧  p_44) -> (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0)
c  in CNF:
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_2
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_1
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨  b^{11, 5}_0
c  in DIMACS:
 11396  11397  11398 -44 -11399 0
 11396  11397  11398 -44 -11400 0
 11396  11397  11398 -44  11401 0

c  1+1 --> 2
c    (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0 ∧  p_44) -> (-b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0)
c  in CNF:
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_2
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨  b^{11, 5}_1
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ -p_44 ∨ -b^{11, 5}_0
c  in DIMACS:
 11396  11397 -11398 -44 -11399 0
 11396  11397 -11398 -44  11400 0
 11396  11397 -11398 -44 -11401 0

c  2+1 --> break 
c    (-b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧  p_44) -> break
c  in CNF:
c     b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 11396 -11397  11398 -44 1162 0


c  2-1 --> 1
c    (-b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧ -p_44) -> (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0)
c  in CNF:
c     b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_2
c     b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_1
c     b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨  b^{11, 5}_0
c  in DIMACS:
 11396 -11397  11398  44 -11399 0
 11396 -11397  11398  44 -11400 0
 11396 -11397  11398  44  11401 0

c  1-1 --> 0
c    (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0 ∧ -p_44) -> (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧ -b^{11, 5}_0)
c  in CNF:
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_2
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_1
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_0
c  in DIMACS:
 11396  11397 -11398  44 -11399 0
 11396  11397 -11398  44 -11400 0
 11396  11397 -11398  44 -11401 0

c  0-1 --> -1
c    (-b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧ -p_44) -> ( b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0)
c  in CNF:
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨  b^{11, 5}_2
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_1
c     b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨  b^{11, 5}_0
c  in DIMACS:
 11396  11397  11398  44  11399 0
 11396  11397  11398  44 -11400 0
 11396  11397  11398  44  11401 0

c  -1-1 --> -2
c    ( b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧  b^{11, 4}_0 ∧ -p_44) -> ( b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0)
c  in CNF:
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨  b^{11, 5}_2
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨  b^{11, 5}_1
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨  p_44 ∨ -b^{11, 5}_0
c  in DIMACS:
-11396  11397 -11398  44  11399 0
-11396  11397 -11398  44  11400 0
-11396  11397 -11398  44 -11401 0

c  -2-1 --> break 
c    ( b^{11, 4}_2 ∧  b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨  b^{11, 4}_0 ∨  p_44 ∨ break
c  in DIMACS:
-11396 -11397  11398  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 4}_2 ∧ -b^{11, 4}_1 ∧ -b^{11, 4}_0 ∧ true) 
c  in CNF:
c    -b^{11, 4}_2 ∨  b^{11, 4}_1 ∨  b^{11, 4}_0 ∨ false 
c  in DIMACS:
-11396  11397  11398  0

c  3 does not represent an automaton state.
c    -(-b^{11, 4}_2 ∧  b^{11, 4}_1 ∧  b^{11, 4}_0 ∧ true) 
c  in CNF:
c     b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ false 
c  in DIMACS:
 11396 -11397 -11398  0
c  -3 does not represent an automaton state.
c    -( b^{11, 4}_2 ∧  b^{11, 4}_1 ∧  b^{11, 4}_0 ∧ true) 
c  in CNF:
c    -b^{11, 4}_2 ∨ -b^{11, 4}_1 ∨ -b^{11, 4}_0 ∨ false 
c  in DIMACS:
-11396 -11397 -11398  0

c i = 5
c  -2+1 --> -1
c    ( b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧  p_55) -> ( b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0)
c  in CNF:
c    -b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨  b^{11, 6}_2
c    -b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_1
c    -b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨  b^{11, 6}_0
c  in DIMACS:
-11399 -11400  11401 -55  11402 0
-11399 -11400  11401 -55 -11403 0
-11399 -11400  11401 -55  11404 0

c  -1+1 --> 0
c    ( b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0 ∧  p_55) -> (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧ -b^{11, 6}_0)
c  in CNF:
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_2
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_1
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_0
c  in DIMACS:
-11399  11400 -11401 -55 -11402 0
-11399  11400 -11401 -55 -11403 0
-11399  11400 -11401 -55 -11404 0

c  0+1 --> 1
c    (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧  p_55) -> (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0)
c  in CNF:
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_2
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_1
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨  b^{11, 6}_0
c  in DIMACS:
 11399  11400  11401 -55 -11402 0
 11399  11400  11401 -55 -11403 0
 11399  11400  11401 -55  11404 0

c  1+1 --> 2
c    (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0 ∧  p_55) -> (-b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0)
c  in CNF:
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_2
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨  b^{11, 6}_1
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ -p_55 ∨ -b^{11, 6}_0
c  in DIMACS:
 11399  11400 -11401 -55 -11402 0
 11399  11400 -11401 -55  11403 0
 11399  11400 -11401 -55 -11404 0

c  2+1 --> break 
c    (-b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧  p_55) -> break
c  in CNF:
c     b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ -p_55 ∨ break
c  in DIMACS:
 11399 -11400  11401 -55 1162 0


c  2-1 --> 1
c    (-b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧ -p_55) -> (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0)
c  in CNF:
c     b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_2
c     b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_1
c     b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨  b^{11, 6}_0
c  in DIMACS:
 11399 -11400  11401  55 -11402 0
 11399 -11400  11401  55 -11403 0
 11399 -11400  11401  55  11404 0

c  1-1 --> 0
c    (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0 ∧ -p_55) -> (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧ -b^{11, 6}_0)
c  in CNF:
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_2
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_1
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_0
c  in DIMACS:
 11399  11400 -11401  55 -11402 0
 11399  11400 -11401  55 -11403 0
 11399  11400 -11401  55 -11404 0

c  0-1 --> -1
c    (-b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧ -p_55) -> ( b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0)
c  in CNF:
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨  b^{11, 6}_2
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_1
c     b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨  b^{11, 6}_0
c  in DIMACS:
 11399  11400  11401  55  11402 0
 11399  11400  11401  55 -11403 0
 11399  11400  11401  55  11404 0

c  -1-1 --> -2
c    ( b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧  b^{11, 5}_0 ∧ -p_55) -> ( b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0)
c  in CNF:
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨  b^{11, 6}_2
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨  b^{11, 6}_1
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨  p_55 ∨ -b^{11, 6}_0
c  in DIMACS:
-11399  11400 -11401  55  11402 0
-11399  11400 -11401  55  11403 0
-11399  11400 -11401  55 -11404 0

c  -2-1 --> break 
c    ( b^{11, 5}_2 ∧  b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧ -p_55) -> break
c  in CNF:
c    -b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨  b^{11, 5}_0 ∨  p_55 ∨ break
c  in DIMACS:
-11399 -11400  11401  55 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 5}_2 ∧ -b^{11, 5}_1 ∧ -b^{11, 5}_0 ∧ true) 
c  in CNF:
c    -b^{11, 5}_2 ∨  b^{11, 5}_1 ∨  b^{11, 5}_0 ∨ false 
c  in DIMACS:
-11399  11400  11401  0

c  3 does not represent an automaton state.
c    -(-b^{11, 5}_2 ∧  b^{11, 5}_1 ∧  b^{11, 5}_0 ∧ true) 
c  in CNF:
c     b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ false 
c  in DIMACS:
 11399 -11400 -11401  0
c  -3 does not represent an automaton state.
c    -( b^{11, 5}_2 ∧  b^{11, 5}_1 ∧  b^{11, 5}_0 ∧ true) 
c  in CNF:
c    -b^{11, 5}_2 ∨ -b^{11, 5}_1 ∨ -b^{11, 5}_0 ∨ false 
c  in DIMACS:
-11399 -11400 -11401  0

c i = 6
c  -2+1 --> -1
c    ( b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧  p_66) -> ( b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0)
c  in CNF:
c    -b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨  b^{11, 7}_2
c    -b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_1
c    -b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨  b^{11, 7}_0
c  in DIMACS:
-11402 -11403  11404 -66  11405 0
-11402 -11403  11404 -66 -11406 0
-11402 -11403  11404 -66  11407 0

c  -1+1 --> 0
c    ( b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0 ∧  p_66) -> (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧ -b^{11, 7}_0)
c  in CNF:
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_2
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_1
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_0
c  in DIMACS:
-11402  11403 -11404 -66 -11405 0
-11402  11403 -11404 -66 -11406 0
-11402  11403 -11404 -66 -11407 0

c  0+1 --> 1
c    (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧  p_66) -> (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0)
c  in CNF:
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_2
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_1
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨  b^{11, 7}_0
c  in DIMACS:
 11402  11403  11404 -66 -11405 0
 11402  11403  11404 -66 -11406 0
 11402  11403  11404 -66  11407 0

c  1+1 --> 2
c    (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0 ∧  p_66) -> (-b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0)
c  in CNF:
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_2
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨  b^{11, 7}_1
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ -p_66 ∨ -b^{11, 7}_0
c  in DIMACS:
 11402  11403 -11404 -66 -11405 0
 11402  11403 -11404 -66  11406 0
 11402  11403 -11404 -66 -11407 0

c  2+1 --> break 
c    (-b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧  p_66) -> break
c  in CNF:
c     b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 11402 -11403  11404 -66 1162 0


c  2-1 --> 1
c    (-b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧ -p_66) -> (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0)
c  in CNF:
c     b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_2
c     b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_1
c     b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨  b^{11, 7}_0
c  in DIMACS:
 11402 -11403  11404  66 -11405 0
 11402 -11403  11404  66 -11406 0
 11402 -11403  11404  66  11407 0

c  1-1 --> 0
c    (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0 ∧ -p_66) -> (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧ -b^{11, 7}_0)
c  in CNF:
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_2
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_1
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_0
c  in DIMACS:
 11402  11403 -11404  66 -11405 0
 11402  11403 -11404  66 -11406 0
 11402  11403 -11404  66 -11407 0

c  0-1 --> -1
c    (-b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧ -p_66) -> ( b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0)
c  in CNF:
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨  b^{11, 7}_2
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_1
c     b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨  b^{11, 7}_0
c  in DIMACS:
 11402  11403  11404  66  11405 0
 11402  11403  11404  66 -11406 0
 11402  11403  11404  66  11407 0

c  -1-1 --> -2
c    ( b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧  b^{11, 6}_0 ∧ -p_66) -> ( b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0)
c  in CNF:
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨  b^{11, 7}_2
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨  b^{11, 7}_1
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨  p_66 ∨ -b^{11, 7}_0
c  in DIMACS:
-11402  11403 -11404  66  11405 0
-11402  11403 -11404  66  11406 0
-11402  11403 -11404  66 -11407 0

c  -2-1 --> break 
c    ( b^{11, 6}_2 ∧  b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨  b^{11, 6}_0 ∨  p_66 ∨ break
c  in DIMACS:
-11402 -11403  11404  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 6}_2 ∧ -b^{11, 6}_1 ∧ -b^{11, 6}_0 ∧ true) 
c  in CNF:
c    -b^{11, 6}_2 ∨  b^{11, 6}_1 ∨  b^{11, 6}_0 ∨ false 
c  in DIMACS:
-11402  11403  11404  0

c  3 does not represent an automaton state.
c    -(-b^{11, 6}_2 ∧  b^{11, 6}_1 ∧  b^{11, 6}_0 ∧ true) 
c  in CNF:
c     b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ false 
c  in DIMACS:
 11402 -11403 -11404  0
c  -3 does not represent an automaton state.
c    -( b^{11, 6}_2 ∧  b^{11, 6}_1 ∧  b^{11, 6}_0 ∧ true) 
c  in CNF:
c    -b^{11, 6}_2 ∨ -b^{11, 6}_1 ∨ -b^{11, 6}_0 ∨ false 
c  in DIMACS:
-11402 -11403 -11404  0

c i = 7
c  -2+1 --> -1
c    ( b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧  p_77) -> ( b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0)
c  in CNF:
c    -b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨  b^{11, 8}_2
c    -b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_1
c    -b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨  b^{11, 8}_0
c  in DIMACS:
-11405 -11406  11407 -77  11408 0
-11405 -11406  11407 -77 -11409 0
-11405 -11406  11407 -77  11410 0

c  -1+1 --> 0
c    ( b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0 ∧  p_77) -> (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧ -b^{11, 8}_0)
c  in CNF:
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_2
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_1
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_0
c  in DIMACS:
-11405  11406 -11407 -77 -11408 0
-11405  11406 -11407 -77 -11409 0
-11405  11406 -11407 -77 -11410 0

c  0+1 --> 1
c    (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧  p_77) -> (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0)
c  in CNF:
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_2
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_1
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨  b^{11, 8}_0
c  in DIMACS:
 11405  11406  11407 -77 -11408 0
 11405  11406  11407 -77 -11409 0
 11405  11406  11407 -77  11410 0

c  1+1 --> 2
c    (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0 ∧  p_77) -> (-b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0)
c  in CNF:
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_2
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨  b^{11, 8}_1
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ -p_77 ∨ -b^{11, 8}_0
c  in DIMACS:
 11405  11406 -11407 -77 -11408 0
 11405  11406 -11407 -77  11409 0
 11405  11406 -11407 -77 -11410 0

c  2+1 --> break 
c    (-b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧  p_77) -> break
c  in CNF:
c     b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ -p_77 ∨ break
c  in DIMACS:
 11405 -11406  11407 -77 1162 0


c  2-1 --> 1
c    (-b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧ -p_77) -> (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0)
c  in CNF:
c     b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_2
c     b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_1
c     b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨  b^{11, 8}_0
c  in DIMACS:
 11405 -11406  11407  77 -11408 0
 11405 -11406  11407  77 -11409 0
 11405 -11406  11407  77  11410 0

c  1-1 --> 0
c    (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0 ∧ -p_77) -> (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧ -b^{11, 8}_0)
c  in CNF:
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_2
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_1
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_0
c  in DIMACS:
 11405  11406 -11407  77 -11408 0
 11405  11406 -11407  77 -11409 0
 11405  11406 -11407  77 -11410 0

c  0-1 --> -1
c    (-b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧ -p_77) -> ( b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0)
c  in CNF:
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨  b^{11, 8}_2
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_1
c     b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨  b^{11, 8}_0
c  in DIMACS:
 11405  11406  11407  77  11408 0
 11405  11406  11407  77 -11409 0
 11405  11406  11407  77  11410 0

c  -1-1 --> -2
c    ( b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧  b^{11, 7}_0 ∧ -p_77) -> ( b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0)
c  in CNF:
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨  b^{11, 8}_2
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨  b^{11, 8}_1
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨  p_77 ∨ -b^{11, 8}_0
c  in DIMACS:
-11405  11406 -11407  77  11408 0
-11405  11406 -11407  77  11409 0
-11405  11406 -11407  77 -11410 0

c  -2-1 --> break 
c    ( b^{11, 7}_2 ∧  b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧ -p_77) -> break
c  in CNF:
c    -b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨  b^{11, 7}_0 ∨  p_77 ∨ break
c  in DIMACS:
-11405 -11406  11407  77 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 7}_2 ∧ -b^{11, 7}_1 ∧ -b^{11, 7}_0 ∧ true) 
c  in CNF:
c    -b^{11, 7}_2 ∨  b^{11, 7}_1 ∨  b^{11, 7}_0 ∨ false 
c  in DIMACS:
-11405  11406  11407  0

c  3 does not represent an automaton state.
c    -(-b^{11, 7}_2 ∧  b^{11, 7}_1 ∧  b^{11, 7}_0 ∧ true) 
c  in CNF:
c     b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ false 
c  in DIMACS:
 11405 -11406 -11407  0
c  -3 does not represent an automaton state.
c    -( b^{11, 7}_2 ∧  b^{11, 7}_1 ∧  b^{11, 7}_0 ∧ true) 
c  in CNF:
c    -b^{11, 7}_2 ∨ -b^{11, 7}_1 ∨ -b^{11, 7}_0 ∨ false 
c  in DIMACS:
-11405 -11406 -11407  0

c i = 8
c  -2+1 --> -1
c    ( b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧  p_88) -> ( b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0)
c  in CNF:
c    -b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨  b^{11, 9}_2
c    -b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_1
c    -b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨  b^{11, 9}_0
c  in DIMACS:
-11408 -11409  11410 -88  11411 0
-11408 -11409  11410 -88 -11412 0
-11408 -11409  11410 -88  11413 0

c  -1+1 --> 0
c    ( b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0 ∧  p_88) -> (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧ -b^{11, 9}_0)
c  in CNF:
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_2
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_1
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_0
c  in DIMACS:
-11408  11409 -11410 -88 -11411 0
-11408  11409 -11410 -88 -11412 0
-11408  11409 -11410 -88 -11413 0

c  0+1 --> 1
c    (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧  p_88) -> (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0)
c  in CNF:
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_2
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_1
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨  b^{11, 9}_0
c  in DIMACS:
 11408  11409  11410 -88 -11411 0
 11408  11409  11410 -88 -11412 0
 11408  11409  11410 -88  11413 0

c  1+1 --> 2
c    (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0 ∧  p_88) -> (-b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0)
c  in CNF:
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_2
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨  b^{11, 9}_1
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ -p_88 ∨ -b^{11, 9}_0
c  in DIMACS:
 11408  11409 -11410 -88 -11411 0
 11408  11409 -11410 -88  11412 0
 11408  11409 -11410 -88 -11413 0

c  2+1 --> break 
c    (-b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧  p_88) -> break
c  in CNF:
c     b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 11408 -11409  11410 -88 1162 0


c  2-1 --> 1
c    (-b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧ -p_88) -> (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0)
c  in CNF:
c     b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_2
c     b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_1
c     b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨  b^{11, 9}_0
c  in DIMACS:
 11408 -11409  11410  88 -11411 0
 11408 -11409  11410  88 -11412 0
 11408 -11409  11410  88  11413 0

c  1-1 --> 0
c    (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0 ∧ -p_88) -> (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧ -b^{11, 9}_0)
c  in CNF:
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_2
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_1
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_0
c  in DIMACS:
 11408  11409 -11410  88 -11411 0
 11408  11409 -11410  88 -11412 0
 11408  11409 -11410  88 -11413 0

c  0-1 --> -1
c    (-b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧ -p_88) -> ( b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0)
c  in CNF:
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨  b^{11, 9}_2
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_1
c     b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨  b^{11, 9}_0
c  in DIMACS:
 11408  11409  11410  88  11411 0
 11408  11409  11410  88 -11412 0
 11408  11409  11410  88  11413 0

c  -1-1 --> -2
c    ( b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧  b^{11, 8}_0 ∧ -p_88) -> ( b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0)
c  in CNF:
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨  b^{11, 9}_2
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨  b^{11, 9}_1
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨  p_88 ∨ -b^{11, 9}_0
c  in DIMACS:
-11408  11409 -11410  88  11411 0
-11408  11409 -11410  88  11412 0
-11408  11409 -11410  88 -11413 0

c  -2-1 --> break 
c    ( b^{11, 8}_2 ∧  b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨  b^{11, 8}_0 ∨  p_88 ∨ break
c  in DIMACS:
-11408 -11409  11410  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 8}_2 ∧ -b^{11, 8}_1 ∧ -b^{11, 8}_0 ∧ true) 
c  in CNF:
c    -b^{11, 8}_2 ∨  b^{11, 8}_1 ∨  b^{11, 8}_0 ∨ false 
c  in DIMACS:
-11408  11409  11410  0

c  3 does not represent an automaton state.
c    -(-b^{11, 8}_2 ∧  b^{11, 8}_1 ∧  b^{11, 8}_0 ∧ true) 
c  in CNF:
c     b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ false 
c  in DIMACS:
 11408 -11409 -11410  0
c  -3 does not represent an automaton state.
c    -( b^{11, 8}_2 ∧  b^{11, 8}_1 ∧  b^{11, 8}_0 ∧ true) 
c  in CNF:
c    -b^{11, 8}_2 ∨ -b^{11, 8}_1 ∨ -b^{11, 8}_0 ∨ false 
c  in DIMACS:
-11408 -11409 -11410  0

c i = 9
c  -2+1 --> -1
c    ( b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧  p_99) -> ( b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0)
c  in CNF:
c    -b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨  b^{11, 10}_2
c    -b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_1
c    -b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨  b^{11, 10}_0
c  in DIMACS:
-11411 -11412  11413 -99  11414 0
-11411 -11412  11413 -99 -11415 0
-11411 -11412  11413 -99  11416 0

c  -1+1 --> 0
c    ( b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0 ∧  p_99) -> (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧ -b^{11, 10}_0)
c  in CNF:
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_2
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_1
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_0
c  in DIMACS:
-11411  11412 -11413 -99 -11414 0
-11411  11412 -11413 -99 -11415 0
-11411  11412 -11413 -99 -11416 0

c  0+1 --> 1
c    (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧  p_99) -> (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0)
c  in CNF:
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_2
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_1
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨  b^{11, 10}_0
c  in DIMACS:
 11411  11412  11413 -99 -11414 0
 11411  11412  11413 -99 -11415 0
 11411  11412  11413 -99  11416 0

c  1+1 --> 2
c    (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0 ∧  p_99) -> (-b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0)
c  in CNF:
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_2
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨  b^{11, 10}_1
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ -p_99 ∨ -b^{11, 10}_0
c  in DIMACS:
 11411  11412 -11413 -99 -11414 0
 11411  11412 -11413 -99  11415 0
 11411  11412 -11413 -99 -11416 0

c  2+1 --> break 
c    (-b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧  p_99) -> break
c  in CNF:
c     b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 11411 -11412  11413 -99 1162 0


c  2-1 --> 1
c    (-b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧ -p_99) -> (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0)
c  in CNF:
c     b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_2
c     b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_1
c     b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨  b^{11, 10}_0
c  in DIMACS:
 11411 -11412  11413  99 -11414 0
 11411 -11412  11413  99 -11415 0
 11411 -11412  11413  99  11416 0

c  1-1 --> 0
c    (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0 ∧ -p_99) -> (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧ -b^{11, 10}_0)
c  in CNF:
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_2
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_1
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_0
c  in DIMACS:
 11411  11412 -11413  99 -11414 0
 11411  11412 -11413  99 -11415 0
 11411  11412 -11413  99 -11416 0

c  0-1 --> -1
c    (-b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧ -p_99) -> ( b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0)
c  in CNF:
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨  b^{11, 10}_2
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_1
c     b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨  b^{11, 10}_0
c  in DIMACS:
 11411  11412  11413  99  11414 0
 11411  11412  11413  99 -11415 0
 11411  11412  11413  99  11416 0

c  -1-1 --> -2
c    ( b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧  b^{11, 9}_0 ∧ -p_99) -> ( b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0)
c  in CNF:
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨  b^{11, 10}_2
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨  b^{11, 10}_1
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨  p_99 ∨ -b^{11, 10}_0
c  in DIMACS:
-11411  11412 -11413  99  11414 0
-11411  11412 -11413  99  11415 0
-11411  11412 -11413  99 -11416 0

c  -2-1 --> break 
c    ( b^{11, 9}_2 ∧  b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨  b^{11, 9}_0 ∨  p_99 ∨ break
c  in DIMACS:
-11411 -11412  11413  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 9}_2 ∧ -b^{11, 9}_1 ∧ -b^{11, 9}_0 ∧ true) 
c  in CNF:
c    -b^{11, 9}_2 ∨  b^{11, 9}_1 ∨  b^{11, 9}_0 ∨ false 
c  in DIMACS:
-11411  11412  11413  0

c  3 does not represent an automaton state.
c    -(-b^{11, 9}_2 ∧  b^{11, 9}_1 ∧  b^{11, 9}_0 ∧ true) 
c  in CNF:
c     b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ false 
c  in DIMACS:
 11411 -11412 -11413  0
c  -3 does not represent an automaton state.
c    -( b^{11, 9}_2 ∧  b^{11, 9}_1 ∧  b^{11, 9}_0 ∧ true) 
c  in CNF:
c    -b^{11, 9}_2 ∨ -b^{11, 9}_1 ∨ -b^{11, 9}_0 ∨ false 
c  in DIMACS:
-11411 -11412 -11413  0

c i = 10
c  -2+1 --> -1
c    ( b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧  p_110) -> ( b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0)
c  in CNF:
c    -b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨  b^{11, 11}_2
c    -b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_1
c    -b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨  b^{11, 11}_0
c  in DIMACS:
-11414 -11415  11416 -110  11417 0
-11414 -11415  11416 -110 -11418 0
-11414 -11415  11416 -110  11419 0

c  -1+1 --> 0
c    ( b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0 ∧  p_110) -> (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧ -b^{11, 11}_0)
c  in CNF:
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_2
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_1
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_0
c  in DIMACS:
-11414  11415 -11416 -110 -11417 0
-11414  11415 -11416 -110 -11418 0
-11414  11415 -11416 -110 -11419 0

c  0+1 --> 1
c    (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧  p_110) -> (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0)
c  in CNF:
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_2
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_1
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨  b^{11, 11}_0
c  in DIMACS:
 11414  11415  11416 -110 -11417 0
 11414  11415  11416 -110 -11418 0
 11414  11415  11416 -110  11419 0

c  1+1 --> 2
c    (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0 ∧  p_110) -> (-b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0)
c  in CNF:
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_2
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨  b^{11, 11}_1
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ -p_110 ∨ -b^{11, 11}_0
c  in DIMACS:
 11414  11415 -11416 -110 -11417 0
 11414  11415 -11416 -110  11418 0
 11414  11415 -11416 -110 -11419 0

c  2+1 --> break 
c    (-b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧  p_110) -> break
c  in CNF:
c     b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 11414 -11415  11416 -110 1162 0


c  2-1 --> 1
c    (-b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧ -p_110) -> (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0)
c  in CNF:
c     b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_2
c     b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_1
c     b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨  b^{11, 11}_0
c  in DIMACS:
 11414 -11415  11416  110 -11417 0
 11414 -11415  11416  110 -11418 0
 11414 -11415  11416  110  11419 0

c  1-1 --> 0
c    (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0 ∧ -p_110) -> (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧ -b^{11, 11}_0)
c  in CNF:
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_2
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_1
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_0
c  in DIMACS:
 11414  11415 -11416  110 -11417 0
 11414  11415 -11416  110 -11418 0
 11414  11415 -11416  110 -11419 0

c  0-1 --> -1
c    (-b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧ -p_110) -> ( b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0)
c  in CNF:
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨  b^{11, 11}_2
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_1
c     b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨  b^{11, 11}_0
c  in DIMACS:
 11414  11415  11416  110  11417 0
 11414  11415  11416  110 -11418 0
 11414  11415  11416  110  11419 0

c  -1-1 --> -2
c    ( b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧  b^{11, 10}_0 ∧ -p_110) -> ( b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0)
c  in CNF:
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨  b^{11, 11}_2
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨  b^{11, 11}_1
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨  p_110 ∨ -b^{11, 11}_0
c  in DIMACS:
-11414  11415 -11416  110  11417 0
-11414  11415 -11416  110  11418 0
-11414  11415 -11416  110 -11419 0

c  -2-1 --> break 
c    ( b^{11, 10}_2 ∧  b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨  b^{11, 10}_0 ∨  p_110 ∨ break
c  in DIMACS:
-11414 -11415  11416  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 10}_2 ∧ -b^{11, 10}_1 ∧ -b^{11, 10}_0 ∧ true) 
c  in CNF:
c    -b^{11, 10}_2 ∨  b^{11, 10}_1 ∨  b^{11, 10}_0 ∨ false 
c  in DIMACS:
-11414  11415  11416  0

c  3 does not represent an automaton state.
c    -(-b^{11, 10}_2 ∧  b^{11, 10}_1 ∧  b^{11, 10}_0 ∧ true) 
c  in CNF:
c     b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ false 
c  in DIMACS:
 11414 -11415 -11416  0
c  -3 does not represent an automaton state.
c    -( b^{11, 10}_2 ∧  b^{11, 10}_1 ∧  b^{11, 10}_0 ∧ true) 
c  in CNF:
c    -b^{11, 10}_2 ∨ -b^{11, 10}_1 ∨ -b^{11, 10}_0 ∨ false 
c  in DIMACS:
-11414 -11415 -11416  0

c i = 11
c  -2+1 --> -1
c    ( b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧  p_121) -> ( b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0)
c  in CNF:
c    -b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨  b^{11, 12}_2
c    -b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_1
c    -b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨  b^{11, 12}_0
c  in DIMACS:
-11417 -11418  11419 -121  11420 0
-11417 -11418  11419 -121 -11421 0
-11417 -11418  11419 -121  11422 0

c  -1+1 --> 0
c    ( b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0 ∧  p_121) -> (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧ -b^{11, 12}_0)
c  in CNF:
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_2
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_1
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_0
c  in DIMACS:
-11417  11418 -11419 -121 -11420 0
-11417  11418 -11419 -121 -11421 0
-11417  11418 -11419 -121 -11422 0

c  0+1 --> 1
c    (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧  p_121) -> (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0)
c  in CNF:
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_2
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_1
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨  b^{11, 12}_0
c  in DIMACS:
 11417  11418  11419 -121 -11420 0
 11417  11418  11419 -121 -11421 0
 11417  11418  11419 -121  11422 0

c  1+1 --> 2
c    (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0 ∧  p_121) -> (-b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0)
c  in CNF:
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_2
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨  b^{11, 12}_1
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ -p_121 ∨ -b^{11, 12}_0
c  in DIMACS:
 11417  11418 -11419 -121 -11420 0
 11417  11418 -11419 -121  11421 0
 11417  11418 -11419 -121 -11422 0

c  2+1 --> break 
c    (-b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧  p_121) -> break
c  in CNF:
c     b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ -p_121 ∨ break
c  in DIMACS:
 11417 -11418  11419 -121 1162 0


c  2-1 --> 1
c    (-b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧ -p_121) -> (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0)
c  in CNF:
c     b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_2
c     b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_1
c     b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨  b^{11, 12}_0
c  in DIMACS:
 11417 -11418  11419  121 -11420 0
 11417 -11418  11419  121 -11421 0
 11417 -11418  11419  121  11422 0

c  1-1 --> 0
c    (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0 ∧ -p_121) -> (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧ -b^{11, 12}_0)
c  in CNF:
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_2
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_1
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_0
c  in DIMACS:
 11417  11418 -11419  121 -11420 0
 11417  11418 -11419  121 -11421 0
 11417  11418 -11419  121 -11422 0

c  0-1 --> -1
c    (-b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧ -p_121) -> ( b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0)
c  in CNF:
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨  b^{11, 12}_2
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_1
c     b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨  b^{11, 12}_0
c  in DIMACS:
 11417  11418  11419  121  11420 0
 11417  11418  11419  121 -11421 0
 11417  11418  11419  121  11422 0

c  -1-1 --> -2
c    ( b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧  b^{11, 11}_0 ∧ -p_121) -> ( b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0)
c  in CNF:
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨  b^{11, 12}_2
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨  b^{11, 12}_1
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨  p_121 ∨ -b^{11, 12}_0
c  in DIMACS:
-11417  11418 -11419  121  11420 0
-11417  11418 -11419  121  11421 0
-11417  11418 -11419  121 -11422 0

c  -2-1 --> break 
c    ( b^{11, 11}_2 ∧  b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧ -p_121) -> break
c  in CNF:
c    -b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨  b^{11, 11}_0 ∨  p_121 ∨ break
c  in DIMACS:
-11417 -11418  11419  121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 11}_2 ∧ -b^{11, 11}_1 ∧ -b^{11, 11}_0 ∧ true) 
c  in CNF:
c    -b^{11, 11}_2 ∨  b^{11, 11}_1 ∨  b^{11, 11}_0 ∨ false 
c  in DIMACS:
-11417  11418  11419  0

c  3 does not represent an automaton state.
c    -(-b^{11, 11}_2 ∧  b^{11, 11}_1 ∧  b^{11, 11}_0 ∧ true) 
c  in CNF:
c     b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ false 
c  in DIMACS:
 11417 -11418 -11419  0
c  -3 does not represent an automaton state.
c    -( b^{11, 11}_2 ∧  b^{11, 11}_1 ∧  b^{11, 11}_0 ∧ true) 
c  in CNF:
c    -b^{11, 11}_2 ∨ -b^{11, 11}_1 ∨ -b^{11, 11}_0 ∨ false 
c  in DIMACS:
-11417 -11418 -11419  0

c i = 12
c  -2+1 --> -1
c    ( b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧  p_132) -> ( b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0)
c  in CNF:
c    -b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨  b^{11, 13}_2
c    -b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_1
c    -b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨  b^{11, 13}_0
c  in DIMACS:
-11420 -11421  11422 -132  11423 0
-11420 -11421  11422 -132 -11424 0
-11420 -11421  11422 -132  11425 0

c  -1+1 --> 0
c    ( b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0 ∧  p_132) -> (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧ -b^{11, 13}_0)
c  in CNF:
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_2
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_1
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_0
c  in DIMACS:
-11420  11421 -11422 -132 -11423 0
-11420  11421 -11422 -132 -11424 0
-11420  11421 -11422 -132 -11425 0

c  0+1 --> 1
c    (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧  p_132) -> (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0)
c  in CNF:
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_2
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_1
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨  b^{11, 13}_0
c  in DIMACS:
 11420  11421  11422 -132 -11423 0
 11420  11421  11422 -132 -11424 0
 11420  11421  11422 -132  11425 0

c  1+1 --> 2
c    (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0 ∧  p_132) -> (-b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0)
c  in CNF:
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_2
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨  b^{11, 13}_1
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ -p_132 ∨ -b^{11, 13}_0
c  in DIMACS:
 11420  11421 -11422 -132 -11423 0
 11420  11421 -11422 -132  11424 0
 11420  11421 -11422 -132 -11425 0

c  2+1 --> break 
c    (-b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧  p_132) -> break
c  in CNF:
c     b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 11420 -11421  11422 -132 1162 0


c  2-1 --> 1
c    (-b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧ -p_132) -> (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0)
c  in CNF:
c     b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_2
c     b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_1
c     b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨  b^{11, 13}_0
c  in DIMACS:
 11420 -11421  11422  132 -11423 0
 11420 -11421  11422  132 -11424 0
 11420 -11421  11422  132  11425 0

c  1-1 --> 0
c    (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0 ∧ -p_132) -> (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧ -b^{11, 13}_0)
c  in CNF:
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_2
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_1
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_0
c  in DIMACS:
 11420  11421 -11422  132 -11423 0
 11420  11421 -11422  132 -11424 0
 11420  11421 -11422  132 -11425 0

c  0-1 --> -1
c    (-b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧ -p_132) -> ( b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0)
c  in CNF:
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨  b^{11, 13}_2
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_1
c     b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨  b^{11, 13}_0
c  in DIMACS:
 11420  11421  11422  132  11423 0
 11420  11421  11422  132 -11424 0
 11420  11421  11422  132  11425 0

c  -1-1 --> -2
c    ( b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧  b^{11, 12}_0 ∧ -p_132) -> ( b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0)
c  in CNF:
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨  b^{11, 13}_2
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨  b^{11, 13}_1
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨  p_132 ∨ -b^{11, 13}_0
c  in DIMACS:
-11420  11421 -11422  132  11423 0
-11420  11421 -11422  132  11424 0
-11420  11421 -11422  132 -11425 0

c  -2-1 --> break 
c    ( b^{11, 12}_2 ∧  b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨  b^{11, 12}_0 ∨  p_132 ∨ break
c  in DIMACS:
-11420 -11421  11422  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 12}_2 ∧ -b^{11, 12}_1 ∧ -b^{11, 12}_0 ∧ true) 
c  in CNF:
c    -b^{11, 12}_2 ∨  b^{11, 12}_1 ∨  b^{11, 12}_0 ∨ false 
c  in DIMACS:
-11420  11421  11422  0

c  3 does not represent an automaton state.
c    -(-b^{11, 12}_2 ∧  b^{11, 12}_1 ∧  b^{11, 12}_0 ∧ true) 
c  in CNF:
c     b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ false 
c  in DIMACS:
 11420 -11421 -11422  0
c  -3 does not represent an automaton state.
c    -( b^{11, 12}_2 ∧  b^{11, 12}_1 ∧  b^{11, 12}_0 ∧ true) 
c  in CNF:
c    -b^{11, 12}_2 ∨ -b^{11, 12}_1 ∨ -b^{11, 12}_0 ∨ false 
c  in DIMACS:
-11420 -11421 -11422  0

c i = 13
c  -2+1 --> -1
c    ( b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧  p_143) -> ( b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0)
c  in CNF:
c    -b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨  b^{11, 14}_2
c    -b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_1
c    -b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨  b^{11, 14}_0
c  in DIMACS:
-11423 -11424  11425 -143  11426 0
-11423 -11424  11425 -143 -11427 0
-11423 -11424  11425 -143  11428 0

c  -1+1 --> 0
c    ( b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0 ∧  p_143) -> (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧ -b^{11, 14}_0)
c  in CNF:
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_2
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_1
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_0
c  in DIMACS:
-11423  11424 -11425 -143 -11426 0
-11423  11424 -11425 -143 -11427 0
-11423  11424 -11425 -143 -11428 0

c  0+1 --> 1
c    (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧  p_143) -> (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0)
c  in CNF:
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_2
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_1
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨  b^{11, 14}_0
c  in DIMACS:
 11423  11424  11425 -143 -11426 0
 11423  11424  11425 -143 -11427 0
 11423  11424  11425 -143  11428 0

c  1+1 --> 2
c    (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0 ∧  p_143) -> (-b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0)
c  in CNF:
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_2
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨  b^{11, 14}_1
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ -p_143 ∨ -b^{11, 14}_0
c  in DIMACS:
 11423  11424 -11425 -143 -11426 0
 11423  11424 -11425 -143  11427 0
 11423  11424 -11425 -143 -11428 0

c  2+1 --> break 
c    (-b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧  p_143) -> break
c  in CNF:
c     b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ -p_143 ∨ break
c  in DIMACS:
 11423 -11424  11425 -143 1162 0


c  2-1 --> 1
c    (-b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧ -p_143) -> (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0)
c  in CNF:
c     b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_2
c     b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_1
c     b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨  b^{11, 14}_0
c  in DIMACS:
 11423 -11424  11425  143 -11426 0
 11423 -11424  11425  143 -11427 0
 11423 -11424  11425  143  11428 0

c  1-1 --> 0
c    (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0 ∧ -p_143) -> (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧ -b^{11, 14}_0)
c  in CNF:
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_2
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_1
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_0
c  in DIMACS:
 11423  11424 -11425  143 -11426 0
 11423  11424 -11425  143 -11427 0
 11423  11424 -11425  143 -11428 0

c  0-1 --> -1
c    (-b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧ -p_143) -> ( b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0)
c  in CNF:
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨  b^{11, 14}_2
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_1
c     b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨  b^{11, 14}_0
c  in DIMACS:
 11423  11424  11425  143  11426 0
 11423  11424  11425  143 -11427 0
 11423  11424  11425  143  11428 0

c  -1-1 --> -2
c    ( b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧  b^{11, 13}_0 ∧ -p_143) -> ( b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0)
c  in CNF:
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨  b^{11, 14}_2
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨  b^{11, 14}_1
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨  p_143 ∨ -b^{11, 14}_0
c  in DIMACS:
-11423  11424 -11425  143  11426 0
-11423  11424 -11425  143  11427 0
-11423  11424 -11425  143 -11428 0

c  -2-1 --> break 
c    ( b^{11, 13}_2 ∧  b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧ -p_143) -> break
c  in CNF:
c    -b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨  b^{11, 13}_0 ∨  p_143 ∨ break
c  in DIMACS:
-11423 -11424  11425  143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 13}_2 ∧ -b^{11, 13}_1 ∧ -b^{11, 13}_0 ∧ true) 
c  in CNF:
c    -b^{11, 13}_2 ∨  b^{11, 13}_1 ∨  b^{11, 13}_0 ∨ false 
c  in DIMACS:
-11423  11424  11425  0

c  3 does not represent an automaton state.
c    -(-b^{11, 13}_2 ∧  b^{11, 13}_1 ∧  b^{11, 13}_0 ∧ true) 
c  in CNF:
c     b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ false 
c  in DIMACS:
 11423 -11424 -11425  0
c  -3 does not represent an automaton state.
c    -( b^{11, 13}_2 ∧  b^{11, 13}_1 ∧  b^{11, 13}_0 ∧ true) 
c  in CNF:
c    -b^{11, 13}_2 ∨ -b^{11, 13}_1 ∨ -b^{11, 13}_0 ∨ false 
c  in DIMACS:
-11423 -11424 -11425  0

c i = 14
c  -2+1 --> -1
c    ( b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧  p_154) -> ( b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0)
c  in CNF:
c    -b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨  b^{11, 15}_2
c    -b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_1
c    -b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨  b^{11, 15}_0
c  in DIMACS:
-11426 -11427  11428 -154  11429 0
-11426 -11427  11428 -154 -11430 0
-11426 -11427  11428 -154  11431 0

c  -1+1 --> 0
c    ( b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0 ∧  p_154) -> (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧ -b^{11, 15}_0)
c  in CNF:
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_2
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_1
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_0
c  in DIMACS:
-11426  11427 -11428 -154 -11429 0
-11426  11427 -11428 -154 -11430 0
-11426  11427 -11428 -154 -11431 0

c  0+1 --> 1
c    (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧  p_154) -> (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0)
c  in CNF:
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_2
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_1
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨  b^{11, 15}_0
c  in DIMACS:
 11426  11427  11428 -154 -11429 0
 11426  11427  11428 -154 -11430 0
 11426  11427  11428 -154  11431 0

c  1+1 --> 2
c    (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0 ∧  p_154) -> (-b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0)
c  in CNF:
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_2
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨  b^{11, 15}_1
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ -p_154 ∨ -b^{11, 15}_0
c  in DIMACS:
 11426  11427 -11428 -154 -11429 0
 11426  11427 -11428 -154  11430 0
 11426  11427 -11428 -154 -11431 0

c  2+1 --> break 
c    (-b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧  p_154) -> break
c  in CNF:
c     b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 11426 -11427  11428 -154 1162 0


c  2-1 --> 1
c    (-b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧ -p_154) -> (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0)
c  in CNF:
c     b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_2
c     b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_1
c     b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨  b^{11, 15}_0
c  in DIMACS:
 11426 -11427  11428  154 -11429 0
 11426 -11427  11428  154 -11430 0
 11426 -11427  11428  154  11431 0

c  1-1 --> 0
c    (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0 ∧ -p_154) -> (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧ -b^{11, 15}_0)
c  in CNF:
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_2
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_1
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_0
c  in DIMACS:
 11426  11427 -11428  154 -11429 0
 11426  11427 -11428  154 -11430 0
 11426  11427 -11428  154 -11431 0

c  0-1 --> -1
c    (-b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧ -p_154) -> ( b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0)
c  in CNF:
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨  b^{11, 15}_2
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_1
c     b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨  b^{11, 15}_0
c  in DIMACS:
 11426  11427  11428  154  11429 0
 11426  11427  11428  154 -11430 0
 11426  11427  11428  154  11431 0

c  -1-1 --> -2
c    ( b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧  b^{11, 14}_0 ∧ -p_154) -> ( b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0)
c  in CNF:
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨  b^{11, 15}_2
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨  b^{11, 15}_1
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨  p_154 ∨ -b^{11, 15}_0
c  in DIMACS:
-11426  11427 -11428  154  11429 0
-11426  11427 -11428  154  11430 0
-11426  11427 -11428  154 -11431 0

c  -2-1 --> break 
c    ( b^{11, 14}_2 ∧  b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨  b^{11, 14}_0 ∨  p_154 ∨ break
c  in DIMACS:
-11426 -11427  11428  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 14}_2 ∧ -b^{11, 14}_1 ∧ -b^{11, 14}_0 ∧ true) 
c  in CNF:
c    -b^{11, 14}_2 ∨  b^{11, 14}_1 ∨  b^{11, 14}_0 ∨ false 
c  in DIMACS:
-11426  11427  11428  0

c  3 does not represent an automaton state.
c    -(-b^{11, 14}_2 ∧  b^{11, 14}_1 ∧  b^{11, 14}_0 ∧ true) 
c  in CNF:
c     b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ false 
c  in DIMACS:
 11426 -11427 -11428  0
c  -3 does not represent an automaton state.
c    -( b^{11, 14}_2 ∧  b^{11, 14}_1 ∧  b^{11, 14}_0 ∧ true) 
c  in CNF:
c    -b^{11, 14}_2 ∨ -b^{11, 14}_1 ∨ -b^{11, 14}_0 ∨ false 
c  in DIMACS:
-11426 -11427 -11428  0

c i = 15
c  -2+1 --> -1
c    ( b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧  p_165) -> ( b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0)
c  in CNF:
c    -b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨  b^{11, 16}_2
c    -b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_1
c    -b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨  b^{11, 16}_0
c  in DIMACS:
-11429 -11430  11431 -165  11432 0
-11429 -11430  11431 -165 -11433 0
-11429 -11430  11431 -165  11434 0

c  -1+1 --> 0
c    ( b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0 ∧  p_165) -> (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧ -b^{11, 16}_0)
c  in CNF:
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_2
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_1
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_0
c  in DIMACS:
-11429  11430 -11431 -165 -11432 0
-11429  11430 -11431 -165 -11433 0
-11429  11430 -11431 -165 -11434 0

c  0+1 --> 1
c    (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧  p_165) -> (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0)
c  in CNF:
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_2
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_1
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨  b^{11, 16}_0
c  in DIMACS:
 11429  11430  11431 -165 -11432 0
 11429  11430  11431 -165 -11433 0
 11429  11430  11431 -165  11434 0

c  1+1 --> 2
c    (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0 ∧  p_165) -> (-b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0)
c  in CNF:
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_2
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨  b^{11, 16}_1
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ -p_165 ∨ -b^{11, 16}_0
c  in DIMACS:
 11429  11430 -11431 -165 -11432 0
 11429  11430 -11431 -165  11433 0
 11429  11430 -11431 -165 -11434 0

c  2+1 --> break 
c    (-b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧  p_165) -> break
c  in CNF:
c     b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 11429 -11430  11431 -165 1162 0


c  2-1 --> 1
c    (-b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧ -p_165) -> (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0)
c  in CNF:
c     b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_2
c     b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_1
c     b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨  b^{11, 16}_0
c  in DIMACS:
 11429 -11430  11431  165 -11432 0
 11429 -11430  11431  165 -11433 0
 11429 -11430  11431  165  11434 0

c  1-1 --> 0
c    (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0 ∧ -p_165) -> (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧ -b^{11, 16}_0)
c  in CNF:
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_2
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_1
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_0
c  in DIMACS:
 11429  11430 -11431  165 -11432 0
 11429  11430 -11431  165 -11433 0
 11429  11430 -11431  165 -11434 0

c  0-1 --> -1
c    (-b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧ -p_165) -> ( b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0)
c  in CNF:
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨  b^{11, 16}_2
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_1
c     b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨  b^{11, 16}_0
c  in DIMACS:
 11429  11430  11431  165  11432 0
 11429  11430  11431  165 -11433 0
 11429  11430  11431  165  11434 0

c  -1-1 --> -2
c    ( b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧  b^{11, 15}_0 ∧ -p_165) -> ( b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0)
c  in CNF:
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨  b^{11, 16}_2
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨  b^{11, 16}_1
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨  p_165 ∨ -b^{11, 16}_0
c  in DIMACS:
-11429  11430 -11431  165  11432 0
-11429  11430 -11431  165  11433 0
-11429  11430 -11431  165 -11434 0

c  -2-1 --> break 
c    ( b^{11, 15}_2 ∧  b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨  b^{11, 15}_0 ∨  p_165 ∨ break
c  in DIMACS:
-11429 -11430  11431  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 15}_2 ∧ -b^{11, 15}_1 ∧ -b^{11, 15}_0 ∧ true) 
c  in CNF:
c    -b^{11, 15}_2 ∨  b^{11, 15}_1 ∨  b^{11, 15}_0 ∨ false 
c  in DIMACS:
-11429  11430  11431  0

c  3 does not represent an automaton state.
c    -(-b^{11, 15}_2 ∧  b^{11, 15}_1 ∧  b^{11, 15}_0 ∧ true) 
c  in CNF:
c     b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ false 
c  in DIMACS:
 11429 -11430 -11431  0
c  -3 does not represent an automaton state.
c    -( b^{11, 15}_2 ∧  b^{11, 15}_1 ∧  b^{11, 15}_0 ∧ true) 
c  in CNF:
c    -b^{11, 15}_2 ∨ -b^{11, 15}_1 ∨ -b^{11, 15}_0 ∨ false 
c  in DIMACS:
-11429 -11430 -11431  0

c i = 16
c  -2+1 --> -1
c    ( b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧  p_176) -> ( b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0)
c  in CNF:
c    -b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨  b^{11, 17}_2
c    -b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_1
c    -b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨  b^{11, 17}_0
c  in DIMACS:
-11432 -11433  11434 -176  11435 0
-11432 -11433  11434 -176 -11436 0
-11432 -11433  11434 -176  11437 0

c  -1+1 --> 0
c    ( b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0 ∧  p_176) -> (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧ -b^{11, 17}_0)
c  in CNF:
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_2
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_1
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_0
c  in DIMACS:
-11432  11433 -11434 -176 -11435 0
-11432  11433 -11434 -176 -11436 0
-11432  11433 -11434 -176 -11437 0

c  0+1 --> 1
c    (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧  p_176) -> (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0)
c  in CNF:
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_2
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_1
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨  b^{11, 17}_0
c  in DIMACS:
 11432  11433  11434 -176 -11435 0
 11432  11433  11434 -176 -11436 0
 11432  11433  11434 -176  11437 0

c  1+1 --> 2
c    (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0 ∧  p_176) -> (-b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0)
c  in CNF:
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_2
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨  b^{11, 17}_1
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ -p_176 ∨ -b^{11, 17}_0
c  in DIMACS:
 11432  11433 -11434 -176 -11435 0
 11432  11433 -11434 -176  11436 0
 11432  11433 -11434 -176 -11437 0

c  2+1 --> break 
c    (-b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧  p_176) -> break
c  in CNF:
c     b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 11432 -11433  11434 -176 1162 0


c  2-1 --> 1
c    (-b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧ -p_176) -> (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0)
c  in CNF:
c     b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_2
c     b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_1
c     b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨  b^{11, 17}_0
c  in DIMACS:
 11432 -11433  11434  176 -11435 0
 11432 -11433  11434  176 -11436 0
 11432 -11433  11434  176  11437 0

c  1-1 --> 0
c    (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0 ∧ -p_176) -> (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧ -b^{11, 17}_0)
c  in CNF:
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_2
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_1
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_0
c  in DIMACS:
 11432  11433 -11434  176 -11435 0
 11432  11433 -11434  176 -11436 0
 11432  11433 -11434  176 -11437 0

c  0-1 --> -1
c    (-b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧ -p_176) -> ( b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0)
c  in CNF:
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨  b^{11, 17}_2
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_1
c     b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨  b^{11, 17}_0
c  in DIMACS:
 11432  11433  11434  176  11435 0
 11432  11433  11434  176 -11436 0
 11432  11433  11434  176  11437 0

c  -1-1 --> -2
c    ( b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧  b^{11, 16}_0 ∧ -p_176) -> ( b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0)
c  in CNF:
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨  b^{11, 17}_2
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨  b^{11, 17}_1
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨  p_176 ∨ -b^{11, 17}_0
c  in DIMACS:
-11432  11433 -11434  176  11435 0
-11432  11433 -11434  176  11436 0
-11432  11433 -11434  176 -11437 0

c  -2-1 --> break 
c    ( b^{11, 16}_2 ∧  b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨  b^{11, 16}_0 ∨  p_176 ∨ break
c  in DIMACS:
-11432 -11433  11434  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 16}_2 ∧ -b^{11, 16}_1 ∧ -b^{11, 16}_0 ∧ true) 
c  in CNF:
c    -b^{11, 16}_2 ∨  b^{11, 16}_1 ∨  b^{11, 16}_0 ∨ false 
c  in DIMACS:
-11432  11433  11434  0

c  3 does not represent an automaton state.
c    -(-b^{11, 16}_2 ∧  b^{11, 16}_1 ∧  b^{11, 16}_0 ∧ true) 
c  in CNF:
c     b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ false 
c  in DIMACS:
 11432 -11433 -11434  0
c  -3 does not represent an automaton state.
c    -( b^{11, 16}_2 ∧  b^{11, 16}_1 ∧  b^{11, 16}_0 ∧ true) 
c  in CNF:
c    -b^{11, 16}_2 ∨ -b^{11, 16}_1 ∨ -b^{11, 16}_0 ∨ false 
c  in DIMACS:
-11432 -11433 -11434  0

c i = 17
c  -2+1 --> -1
c    ( b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧  p_187) -> ( b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0)
c  in CNF:
c    -b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨  b^{11, 18}_2
c    -b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_1
c    -b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨  b^{11, 18}_0
c  in DIMACS:
-11435 -11436  11437 -187  11438 0
-11435 -11436  11437 -187 -11439 0
-11435 -11436  11437 -187  11440 0

c  -1+1 --> 0
c    ( b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0 ∧  p_187) -> (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧ -b^{11, 18}_0)
c  in CNF:
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_2
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_1
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_0
c  in DIMACS:
-11435  11436 -11437 -187 -11438 0
-11435  11436 -11437 -187 -11439 0
-11435  11436 -11437 -187 -11440 0

c  0+1 --> 1
c    (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧  p_187) -> (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0)
c  in CNF:
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_2
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_1
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨  b^{11, 18}_0
c  in DIMACS:
 11435  11436  11437 -187 -11438 0
 11435  11436  11437 -187 -11439 0
 11435  11436  11437 -187  11440 0

c  1+1 --> 2
c    (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0 ∧  p_187) -> (-b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0)
c  in CNF:
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_2
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨  b^{11, 18}_1
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ -p_187 ∨ -b^{11, 18}_0
c  in DIMACS:
 11435  11436 -11437 -187 -11438 0
 11435  11436 -11437 -187  11439 0
 11435  11436 -11437 -187 -11440 0

c  2+1 --> break 
c    (-b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧  p_187) -> break
c  in CNF:
c     b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ -p_187 ∨ break
c  in DIMACS:
 11435 -11436  11437 -187 1162 0


c  2-1 --> 1
c    (-b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧ -p_187) -> (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0)
c  in CNF:
c     b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_2
c     b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_1
c     b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨  b^{11, 18}_0
c  in DIMACS:
 11435 -11436  11437  187 -11438 0
 11435 -11436  11437  187 -11439 0
 11435 -11436  11437  187  11440 0

c  1-1 --> 0
c    (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0 ∧ -p_187) -> (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧ -b^{11, 18}_0)
c  in CNF:
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_2
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_1
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_0
c  in DIMACS:
 11435  11436 -11437  187 -11438 0
 11435  11436 -11437  187 -11439 0
 11435  11436 -11437  187 -11440 0

c  0-1 --> -1
c    (-b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧ -p_187) -> ( b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0)
c  in CNF:
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨  b^{11, 18}_2
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_1
c     b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨  b^{11, 18}_0
c  in DIMACS:
 11435  11436  11437  187  11438 0
 11435  11436  11437  187 -11439 0
 11435  11436  11437  187  11440 0

c  -1-1 --> -2
c    ( b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧  b^{11, 17}_0 ∧ -p_187) -> ( b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0)
c  in CNF:
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨  b^{11, 18}_2
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨  b^{11, 18}_1
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨  p_187 ∨ -b^{11, 18}_0
c  in DIMACS:
-11435  11436 -11437  187  11438 0
-11435  11436 -11437  187  11439 0
-11435  11436 -11437  187 -11440 0

c  -2-1 --> break 
c    ( b^{11, 17}_2 ∧  b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧ -p_187) -> break
c  in CNF:
c    -b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨  b^{11, 17}_0 ∨  p_187 ∨ break
c  in DIMACS:
-11435 -11436  11437  187 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 17}_2 ∧ -b^{11, 17}_1 ∧ -b^{11, 17}_0 ∧ true) 
c  in CNF:
c    -b^{11, 17}_2 ∨  b^{11, 17}_1 ∨  b^{11, 17}_0 ∨ false 
c  in DIMACS:
-11435  11436  11437  0

c  3 does not represent an automaton state.
c    -(-b^{11, 17}_2 ∧  b^{11, 17}_1 ∧  b^{11, 17}_0 ∧ true) 
c  in CNF:
c     b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ false 
c  in DIMACS:
 11435 -11436 -11437  0
c  -3 does not represent an automaton state.
c    -( b^{11, 17}_2 ∧  b^{11, 17}_1 ∧  b^{11, 17}_0 ∧ true) 
c  in CNF:
c    -b^{11, 17}_2 ∨ -b^{11, 17}_1 ∨ -b^{11, 17}_0 ∨ false 
c  in DIMACS:
-11435 -11436 -11437  0

c i = 18
c  -2+1 --> -1
c    ( b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧  p_198) -> ( b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0)
c  in CNF:
c    -b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨  b^{11, 19}_2
c    -b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_1
c    -b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨  b^{11, 19}_0
c  in DIMACS:
-11438 -11439  11440 -198  11441 0
-11438 -11439  11440 -198 -11442 0
-11438 -11439  11440 -198  11443 0

c  -1+1 --> 0
c    ( b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0 ∧  p_198) -> (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧ -b^{11, 19}_0)
c  in CNF:
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_2
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_1
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_0
c  in DIMACS:
-11438  11439 -11440 -198 -11441 0
-11438  11439 -11440 -198 -11442 0
-11438  11439 -11440 -198 -11443 0

c  0+1 --> 1
c    (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧  p_198) -> (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0)
c  in CNF:
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_2
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_1
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨  b^{11, 19}_0
c  in DIMACS:
 11438  11439  11440 -198 -11441 0
 11438  11439  11440 -198 -11442 0
 11438  11439  11440 -198  11443 0

c  1+1 --> 2
c    (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0 ∧  p_198) -> (-b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0)
c  in CNF:
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_2
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨  b^{11, 19}_1
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ -p_198 ∨ -b^{11, 19}_0
c  in DIMACS:
 11438  11439 -11440 -198 -11441 0
 11438  11439 -11440 -198  11442 0
 11438  11439 -11440 -198 -11443 0

c  2+1 --> break 
c    (-b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧  p_198) -> break
c  in CNF:
c     b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 11438 -11439  11440 -198 1162 0


c  2-1 --> 1
c    (-b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧ -p_198) -> (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0)
c  in CNF:
c     b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_2
c     b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_1
c     b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨  b^{11, 19}_0
c  in DIMACS:
 11438 -11439  11440  198 -11441 0
 11438 -11439  11440  198 -11442 0
 11438 -11439  11440  198  11443 0

c  1-1 --> 0
c    (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0 ∧ -p_198) -> (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧ -b^{11, 19}_0)
c  in CNF:
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_2
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_1
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_0
c  in DIMACS:
 11438  11439 -11440  198 -11441 0
 11438  11439 -11440  198 -11442 0
 11438  11439 -11440  198 -11443 0

c  0-1 --> -1
c    (-b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧ -p_198) -> ( b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0)
c  in CNF:
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨  b^{11, 19}_2
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_1
c     b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨  b^{11, 19}_0
c  in DIMACS:
 11438  11439  11440  198  11441 0
 11438  11439  11440  198 -11442 0
 11438  11439  11440  198  11443 0

c  -1-1 --> -2
c    ( b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧  b^{11, 18}_0 ∧ -p_198) -> ( b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0)
c  in CNF:
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨  b^{11, 19}_2
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨  b^{11, 19}_1
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨  p_198 ∨ -b^{11, 19}_0
c  in DIMACS:
-11438  11439 -11440  198  11441 0
-11438  11439 -11440  198  11442 0
-11438  11439 -11440  198 -11443 0

c  -2-1 --> break 
c    ( b^{11, 18}_2 ∧  b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨  b^{11, 18}_0 ∨  p_198 ∨ break
c  in DIMACS:
-11438 -11439  11440  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 18}_2 ∧ -b^{11, 18}_1 ∧ -b^{11, 18}_0 ∧ true) 
c  in CNF:
c    -b^{11, 18}_2 ∨  b^{11, 18}_1 ∨  b^{11, 18}_0 ∨ false 
c  in DIMACS:
-11438  11439  11440  0

c  3 does not represent an automaton state.
c    -(-b^{11, 18}_2 ∧  b^{11, 18}_1 ∧  b^{11, 18}_0 ∧ true) 
c  in CNF:
c     b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ false 
c  in DIMACS:
 11438 -11439 -11440  0
c  -3 does not represent an automaton state.
c    -( b^{11, 18}_2 ∧  b^{11, 18}_1 ∧  b^{11, 18}_0 ∧ true) 
c  in CNF:
c    -b^{11, 18}_2 ∨ -b^{11, 18}_1 ∨ -b^{11, 18}_0 ∨ false 
c  in DIMACS:
-11438 -11439 -11440  0

c i = 19
c  -2+1 --> -1
c    ( b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧  p_209) -> ( b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0)
c  in CNF:
c    -b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨  b^{11, 20}_2
c    -b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_1
c    -b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨  b^{11, 20}_0
c  in DIMACS:
-11441 -11442  11443 -209  11444 0
-11441 -11442  11443 -209 -11445 0
-11441 -11442  11443 -209  11446 0

c  -1+1 --> 0
c    ( b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0 ∧  p_209) -> (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧ -b^{11, 20}_0)
c  in CNF:
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_2
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_1
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_0
c  in DIMACS:
-11441  11442 -11443 -209 -11444 0
-11441  11442 -11443 -209 -11445 0
-11441  11442 -11443 -209 -11446 0

c  0+1 --> 1
c    (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧  p_209) -> (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0)
c  in CNF:
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_2
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_1
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨  b^{11, 20}_0
c  in DIMACS:
 11441  11442  11443 -209 -11444 0
 11441  11442  11443 -209 -11445 0
 11441  11442  11443 -209  11446 0

c  1+1 --> 2
c    (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0 ∧  p_209) -> (-b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0)
c  in CNF:
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_2
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨  b^{11, 20}_1
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ -p_209 ∨ -b^{11, 20}_0
c  in DIMACS:
 11441  11442 -11443 -209 -11444 0
 11441  11442 -11443 -209  11445 0
 11441  11442 -11443 -209 -11446 0

c  2+1 --> break 
c    (-b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧  p_209) -> break
c  in CNF:
c     b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ -p_209 ∨ break
c  in DIMACS:
 11441 -11442  11443 -209 1162 0


c  2-1 --> 1
c    (-b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧ -p_209) -> (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0)
c  in CNF:
c     b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_2
c     b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_1
c     b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨  b^{11, 20}_0
c  in DIMACS:
 11441 -11442  11443  209 -11444 0
 11441 -11442  11443  209 -11445 0
 11441 -11442  11443  209  11446 0

c  1-1 --> 0
c    (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0 ∧ -p_209) -> (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧ -b^{11, 20}_0)
c  in CNF:
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_2
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_1
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_0
c  in DIMACS:
 11441  11442 -11443  209 -11444 0
 11441  11442 -11443  209 -11445 0
 11441  11442 -11443  209 -11446 0

c  0-1 --> -1
c    (-b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧ -p_209) -> ( b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0)
c  in CNF:
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨  b^{11, 20}_2
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_1
c     b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨  b^{11, 20}_0
c  in DIMACS:
 11441  11442  11443  209  11444 0
 11441  11442  11443  209 -11445 0
 11441  11442  11443  209  11446 0

c  -1-1 --> -2
c    ( b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧  b^{11, 19}_0 ∧ -p_209) -> ( b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0)
c  in CNF:
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨  b^{11, 20}_2
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨  b^{11, 20}_1
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨  p_209 ∨ -b^{11, 20}_0
c  in DIMACS:
-11441  11442 -11443  209  11444 0
-11441  11442 -11443  209  11445 0
-11441  11442 -11443  209 -11446 0

c  -2-1 --> break 
c    ( b^{11, 19}_2 ∧  b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧ -p_209) -> break
c  in CNF:
c    -b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨  b^{11, 19}_0 ∨  p_209 ∨ break
c  in DIMACS:
-11441 -11442  11443  209 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 19}_2 ∧ -b^{11, 19}_1 ∧ -b^{11, 19}_0 ∧ true) 
c  in CNF:
c    -b^{11, 19}_2 ∨  b^{11, 19}_1 ∨  b^{11, 19}_0 ∨ false 
c  in DIMACS:
-11441  11442  11443  0

c  3 does not represent an automaton state.
c    -(-b^{11, 19}_2 ∧  b^{11, 19}_1 ∧  b^{11, 19}_0 ∧ true) 
c  in CNF:
c     b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ false 
c  in DIMACS:
 11441 -11442 -11443  0
c  -3 does not represent an automaton state.
c    -( b^{11, 19}_2 ∧  b^{11, 19}_1 ∧  b^{11, 19}_0 ∧ true) 
c  in CNF:
c    -b^{11, 19}_2 ∨ -b^{11, 19}_1 ∨ -b^{11, 19}_0 ∨ false 
c  in DIMACS:
-11441 -11442 -11443  0

c i = 20
c  -2+1 --> -1
c    ( b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧  p_220) -> ( b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0)
c  in CNF:
c    -b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨  b^{11, 21}_2
c    -b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_1
c    -b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨  b^{11, 21}_0
c  in DIMACS:
-11444 -11445  11446 -220  11447 0
-11444 -11445  11446 -220 -11448 0
-11444 -11445  11446 -220  11449 0

c  -1+1 --> 0
c    ( b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0 ∧  p_220) -> (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧ -b^{11, 21}_0)
c  in CNF:
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_2
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_1
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_0
c  in DIMACS:
-11444  11445 -11446 -220 -11447 0
-11444  11445 -11446 -220 -11448 0
-11444  11445 -11446 -220 -11449 0

c  0+1 --> 1
c    (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧  p_220) -> (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0)
c  in CNF:
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_2
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_1
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨  b^{11, 21}_0
c  in DIMACS:
 11444  11445  11446 -220 -11447 0
 11444  11445  11446 -220 -11448 0
 11444  11445  11446 -220  11449 0

c  1+1 --> 2
c    (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0 ∧  p_220) -> (-b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0)
c  in CNF:
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_2
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨  b^{11, 21}_1
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ -p_220 ∨ -b^{11, 21}_0
c  in DIMACS:
 11444  11445 -11446 -220 -11447 0
 11444  11445 -11446 -220  11448 0
 11444  11445 -11446 -220 -11449 0

c  2+1 --> break 
c    (-b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧  p_220) -> break
c  in CNF:
c     b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 11444 -11445  11446 -220 1162 0


c  2-1 --> 1
c    (-b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧ -p_220) -> (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0)
c  in CNF:
c     b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_2
c     b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_1
c     b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨  b^{11, 21}_0
c  in DIMACS:
 11444 -11445  11446  220 -11447 0
 11444 -11445  11446  220 -11448 0
 11444 -11445  11446  220  11449 0

c  1-1 --> 0
c    (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0 ∧ -p_220) -> (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧ -b^{11, 21}_0)
c  in CNF:
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_2
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_1
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_0
c  in DIMACS:
 11444  11445 -11446  220 -11447 0
 11444  11445 -11446  220 -11448 0
 11444  11445 -11446  220 -11449 0

c  0-1 --> -1
c    (-b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧ -p_220) -> ( b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0)
c  in CNF:
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨  b^{11, 21}_2
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_1
c     b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨  b^{11, 21}_0
c  in DIMACS:
 11444  11445  11446  220  11447 0
 11444  11445  11446  220 -11448 0
 11444  11445  11446  220  11449 0

c  -1-1 --> -2
c    ( b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧  b^{11, 20}_0 ∧ -p_220) -> ( b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0)
c  in CNF:
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨  b^{11, 21}_2
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨  b^{11, 21}_1
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨  p_220 ∨ -b^{11, 21}_0
c  in DIMACS:
-11444  11445 -11446  220  11447 0
-11444  11445 -11446  220  11448 0
-11444  11445 -11446  220 -11449 0

c  -2-1 --> break 
c    ( b^{11, 20}_2 ∧  b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨  b^{11, 20}_0 ∨  p_220 ∨ break
c  in DIMACS:
-11444 -11445  11446  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 20}_2 ∧ -b^{11, 20}_1 ∧ -b^{11, 20}_0 ∧ true) 
c  in CNF:
c    -b^{11, 20}_2 ∨  b^{11, 20}_1 ∨  b^{11, 20}_0 ∨ false 
c  in DIMACS:
-11444  11445  11446  0

c  3 does not represent an automaton state.
c    -(-b^{11, 20}_2 ∧  b^{11, 20}_1 ∧  b^{11, 20}_0 ∧ true) 
c  in CNF:
c     b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ false 
c  in DIMACS:
 11444 -11445 -11446  0
c  -3 does not represent an automaton state.
c    -( b^{11, 20}_2 ∧  b^{11, 20}_1 ∧  b^{11, 20}_0 ∧ true) 
c  in CNF:
c    -b^{11, 20}_2 ∨ -b^{11, 20}_1 ∨ -b^{11, 20}_0 ∨ false 
c  in DIMACS:
-11444 -11445 -11446  0

c i = 21
c  -2+1 --> -1
c    ( b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧  p_231) -> ( b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0)
c  in CNF:
c    -b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨  b^{11, 22}_2
c    -b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_1
c    -b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨  b^{11, 22}_0
c  in DIMACS:
-11447 -11448  11449 -231  11450 0
-11447 -11448  11449 -231 -11451 0
-11447 -11448  11449 -231  11452 0

c  -1+1 --> 0
c    ( b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0 ∧  p_231) -> (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧ -b^{11, 22}_0)
c  in CNF:
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_2
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_1
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_0
c  in DIMACS:
-11447  11448 -11449 -231 -11450 0
-11447  11448 -11449 -231 -11451 0
-11447  11448 -11449 -231 -11452 0

c  0+1 --> 1
c    (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧  p_231) -> (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0)
c  in CNF:
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_2
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_1
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨  b^{11, 22}_0
c  in DIMACS:
 11447  11448  11449 -231 -11450 0
 11447  11448  11449 -231 -11451 0
 11447  11448  11449 -231  11452 0

c  1+1 --> 2
c    (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0 ∧  p_231) -> (-b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0)
c  in CNF:
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_2
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨  b^{11, 22}_1
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ -p_231 ∨ -b^{11, 22}_0
c  in DIMACS:
 11447  11448 -11449 -231 -11450 0
 11447  11448 -11449 -231  11451 0
 11447  11448 -11449 -231 -11452 0

c  2+1 --> break 
c    (-b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧  p_231) -> break
c  in CNF:
c     b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 11447 -11448  11449 -231 1162 0


c  2-1 --> 1
c    (-b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧ -p_231) -> (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0)
c  in CNF:
c     b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_2
c     b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_1
c     b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨  b^{11, 22}_0
c  in DIMACS:
 11447 -11448  11449  231 -11450 0
 11447 -11448  11449  231 -11451 0
 11447 -11448  11449  231  11452 0

c  1-1 --> 0
c    (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0 ∧ -p_231) -> (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧ -b^{11, 22}_0)
c  in CNF:
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_2
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_1
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_0
c  in DIMACS:
 11447  11448 -11449  231 -11450 0
 11447  11448 -11449  231 -11451 0
 11447  11448 -11449  231 -11452 0

c  0-1 --> -1
c    (-b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧ -p_231) -> ( b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0)
c  in CNF:
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨  b^{11, 22}_2
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_1
c     b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨  b^{11, 22}_0
c  in DIMACS:
 11447  11448  11449  231  11450 0
 11447  11448  11449  231 -11451 0
 11447  11448  11449  231  11452 0

c  -1-1 --> -2
c    ( b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧  b^{11, 21}_0 ∧ -p_231) -> ( b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0)
c  in CNF:
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨  b^{11, 22}_2
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨  b^{11, 22}_1
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨  p_231 ∨ -b^{11, 22}_0
c  in DIMACS:
-11447  11448 -11449  231  11450 0
-11447  11448 -11449  231  11451 0
-11447  11448 -11449  231 -11452 0

c  -2-1 --> break 
c    ( b^{11, 21}_2 ∧  b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨  b^{11, 21}_0 ∨  p_231 ∨ break
c  in DIMACS:
-11447 -11448  11449  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 21}_2 ∧ -b^{11, 21}_1 ∧ -b^{11, 21}_0 ∧ true) 
c  in CNF:
c    -b^{11, 21}_2 ∨  b^{11, 21}_1 ∨  b^{11, 21}_0 ∨ false 
c  in DIMACS:
-11447  11448  11449  0

c  3 does not represent an automaton state.
c    -(-b^{11, 21}_2 ∧  b^{11, 21}_1 ∧  b^{11, 21}_0 ∧ true) 
c  in CNF:
c     b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ false 
c  in DIMACS:
 11447 -11448 -11449  0
c  -3 does not represent an automaton state.
c    -( b^{11, 21}_2 ∧  b^{11, 21}_1 ∧  b^{11, 21}_0 ∧ true) 
c  in CNF:
c    -b^{11, 21}_2 ∨ -b^{11, 21}_1 ∨ -b^{11, 21}_0 ∨ false 
c  in DIMACS:
-11447 -11448 -11449  0

c i = 22
c  -2+1 --> -1
c    ( b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧  p_242) -> ( b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0)
c  in CNF:
c    -b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨  b^{11, 23}_2
c    -b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_1
c    -b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨  b^{11, 23}_0
c  in DIMACS:
-11450 -11451  11452 -242  11453 0
-11450 -11451  11452 -242 -11454 0
-11450 -11451  11452 -242  11455 0

c  -1+1 --> 0
c    ( b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0 ∧  p_242) -> (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧ -b^{11, 23}_0)
c  in CNF:
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_2
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_1
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_0
c  in DIMACS:
-11450  11451 -11452 -242 -11453 0
-11450  11451 -11452 -242 -11454 0
-11450  11451 -11452 -242 -11455 0

c  0+1 --> 1
c    (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧  p_242) -> (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0)
c  in CNF:
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_2
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_1
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨  b^{11, 23}_0
c  in DIMACS:
 11450  11451  11452 -242 -11453 0
 11450  11451  11452 -242 -11454 0
 11450  11451  11452 -242  11455 0

c  1+1 --> 2
c    (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0 ∧  p_242) -> (-b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0)
c  in CNF:
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_2
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨  b^{11, 23}_1
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ -p_242 ∨ -b^{11, 23}_0
c  in DIMACS:
 11450  11451 -11452 -242 -11453 0
 11450  11451 -11452 -242  11454 0
 11450  11451 -11452 -242 -11455 0

c  2+1 --> break 
c    (-b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧  p_242) -> break
c  in CNF:
c     b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 11450 -11451  11452 -242 1162 0


c  2-1 --> 1
c    (-b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧ -p_242) -> (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0)
c  in CNF:
c     b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_2
c     b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_1
c     b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨  b^{11, 23}_0
c  in DIMACS:
 11450 -11451  11452  242 -11453 0
 11450 -11451  11452  242 -11454 0
 11450 -11451  11452  242  11455 0

c  1-1 --> 0
c    (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0 ∧ -p_242) -> (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧ -b^{11, 23}_0)
c  in CNF:
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_2
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_1
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_0
c  in DIMACS:
 11450  11451 -11452  242 -11453 0
 11450  11451 -11452  242 -11454 0
 11450  11451 -11452  242 -11455 0

c  0-1 --> -1
c    (-b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧ -p_242) -> ( b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0)
c  in CNF:
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨  b^{11, 23}_2
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_1
c     b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨  b^{11, 23}_0
c  in DIMACS:
 11450  11451  11452  242  11453 0
 11450  11451  11452  242 -11454 0
 11450  11451  11452  242  11455 0

c  -1-1 --> -2
c    ( b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧  b^{11, 22}_0 ∧ -p_242) -> ( b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0)
c  in CNF:
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨  b^{11, 23}_2
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨  b^{11, 23}_1
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨  p_242 ∨ -b^{11, 23}_0
c  in DIMACS:
-11450  11451 -11452  242  11453 0
-11450  11451 -11452  242  11454 0
-11450  11451 -11452  242 -11455 0

c  -2-1 --> break 
c    ( b^{11, 22}_2 ∧  b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨  b^{11, 22}_0 ∨  p_242 ∨ break
c  in DIMACS:
-11450 -11451  11452  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 22}_2 ∧ -b^{11, 22}_1 ∧ -b^{11, 22}_0 ∧ true) 
c  in CNF:
c    -b^{11, 22}_2 ∨  b^{11, 22}_1 ∨  b^{11, 22}_0 ∨ false 
c  in DIMACS:
-11450  11451  11452  0

c  3 does not represent an automaton state.
c    -(-b^{11, 22}_2 ∧  b^{11, 22}_1 ∧  b^{11, 22}_0 ∧ true) 
c  in CNF:
c     b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ false 
c  in DIMACS:
 11450 -11451 -11452  0
c  -3 does not represent an automaton state.
c    -( b^{11, 22}_2 ∧  b^{11, 22}_1 ∧  b^{11, 22}_0 ∧ true) 
c  in CNF:
c    -b^{11, 22}_2 ∨ -b^{11, 22}_1 ∨ -b^{11, 22}_0 ∨ false 
c  in DIMACS:
-11450 -11451 -11452  0

c i = 23
c  -2+1 --> -1
c    ( b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧  p_253) -> ( b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0)
c  in CNF:
c    -b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨  b^{11, 24}_2
c    -b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_1
c    -b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨  b^{11, 24}_0
c  in DIMACS:
-11453 -11454  11455 -253  11456 0
-11453 -11454  11455 -253 -11457 0
-11453 -11454  11455 -253  11458 0

c  -1+1 --> 0
c    ( b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0 ∧  p_253) -> (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧ -b^{11, 24}_0)
c  in CNF:
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_2
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_1
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_0
c  in DIMACS:
-11453  11454 -11455 -253 -11456 0
-11453  11454 -11455 -253 -11457 0
-11453  11454 -11455 -253 -11458 0

c  0+1 --> 1
c    (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧  p_253) -> (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0)
c  in CNF:
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_2
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_1
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨  b^{11, 24}_0
c  in DIMACS:
 11453  11454  11455 -253 -11456 0
 11453  11454  11455 -253 -11457 0
 11453  11454  11455 -253  11458 0

c  1+1 --> 2
c    (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0 ∧  p_253) -> (-b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0)
c  in CNF:
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_2
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨  b^{11, 24}_1
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ -p_253 ∨ -b^{11, 24}_0
c  in DIMACS:
 11453  11454 -11455 -253 -11456 0
 11453  11454 -11455 -253  11457 0
 11453  11454 -11455 -253 -11458 0

c  2+1 --> break 
c    (-b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧  p_253) -> break
c  in CNF:
c     b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ -p_253 ∨ break
c  in DIMACS:
 11453 -11454  11455 -253 1162 0


c  2-1 --> 1
c    (-b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧ -p_253) -> (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0)
c  in CNF:
c     b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_2
c     b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_1
c     b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨  b^{11, 24}_0
c  in DIMACS:
 11453 -11454  11455  253 -11456 0
 11453 -11454  11455  253 -11457 0
 11453 -11454  11455  253  11458 0

c  1-1 --> 0
c    (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0 ∧ -p_253) -> (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧ -b^{11, 24}_0)
c  in CNF:
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_2
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_1
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_0
c  in DIMACS:
 11453  11454 -11455  253 -11456 0
 11453  11454 -11455  253 -11457 0
 11453  11454 -11455  253 -11458 0

c  0-1 --> -1
c    (-b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧ -p_253) -> ( b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0)
c  in CNF:
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨  b^{11, 24}_2
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_1
c     b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨  b^{11, 24}_0
c  in DIMACS:
 11453  11454  11455  253  11456 0
 11453  11454  11455  253 -11457 0
 11453  11454  11455  253  11458 0

c  -1-1 --> -2
c    ( b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧  b^{11, 23}_0 ∧ -p_253) -> ( b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0)
c  in CNF:
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨  b^{11, 24}_2
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨  b^{11, 24}_1
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨  p_253 ∨ -b^{11, 24}_0
c  in DIMACS:
-11453  11454 -11455  253  11456 0
-11453  11454 -11455  253  11457 0
-11453  11454 -11455  253 -11458 0

c  -2-1 --> break 
c    ( b^{11, 23}_2 ∧  b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧ -p_253) -> break
c  in CNF:
c    -b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨  b^{11, 23}_0 ∨  p_253 ∨ break
c  in DIMACS:
-11453 -11454  11455  253 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 23}_2 ∧ -b^{11, 23}_1 ∧ -b^{11, 23}_0 ∧ true) 
c  in CNF:
c    -b^{11, 23}_2 ∨  b^{11, 23}_1 ∨  b^{11, 23}_0 ∨ false 
c  in DIMACS:
-11453  11454  11455  0

c  3 does not represent an automaton state.
c    -(-b^{11, 23}_2 ∧  b^{11, 23}_1 ∧  b^{11, 23}_0 ∧ true) 
c  in CNF:
c     b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ false 
c  in DIMACS:
 11453 -11454 -11455  0
c  -3 does not represent an automaton state.
c    -( b^{11, 23}_2 ∧  b^{11, 23}_1 ∧  b^{11, 23}_0 ∧ true) 
c  in CNF:
c    -b^{11, 23}_2 ∨ -b^{11, 23}_1 ∨ -b^{11, 23}_0 ∨ false 
c  in DIMACS:
-11453 -11454 -11455  0

c i = 24
c  -2+1 --> -1
c    ( b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧  p_264) -> ( b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0)
c  in CNF:
c    -b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨  b^{11, 25}_2
c    -b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_1
c    -b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨  b^{11, 25}_0
c  in DIMACS:
-11456 -11457  11458 -264  11459 0
-11456 -11457  11458 -264 -11460 0
-11456 -11457  11458 -264  11461 0

c  -1+1 --> 0
c    ( b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0 ∧  p_264) -> (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧ -b^{11, 25}_0)
c  in CNF:
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_2
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_1
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_0
c  in DIMACS:
-11456  11457 -11458 -264 -11459 0
-11456  11457 -11458 -264 -11460 0
-11456  11457 -11458 -264 -11461 0

c  0+1 --> 1
c    (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧  p_264) -> (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0)
c  in CNF:
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_2
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_1
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨  b^{11, 25}_0
c  in DIMACS:
 11456  11457  11458 -264 -11459 0
 11456  11457  11458 -264 -11460 0
 11456  11457  11458 -264  11461 0

c  1+1 --> 2
c    (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0 ∧  p_264) -> (-b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0)
c  in CNF:
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_2
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨  b^{11, 25}_1
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ -p_264 ∨ -b^{11, 25}_0
c  in DIMACS:
 11456  11457 -11458 -264 -11459 0
 11456  11457 -11458 -264  11460 0
 11456  11457 -11458 -264 -11461 0

c  2+1 --> break 
c    (-b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧  p_264) -> break
c  in CNF:
c     b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 11456 -11457  11458 -264 1162 0


c  2-1 --> 1
c    (-b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧ -p_264) -> (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0)
c  in CNF:
c     b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_2
c     b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_1
c     b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨  b^{11, 25}_0
c  in DIMACS:
 11456 -11457  11458  264 -11459 0
 11456 -11457  11458  264 -11460 0
 11456 -11457  11458  264  11461 0

c  1-1 --> 0
c    (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0 ∧ -p_264) -> (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧ -b^{11, 25}_0)
c  in CNF:
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_2
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_1
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_0
c  in DIMACS:
 11456  11457 -11458  264 -11459 0
 11456  11457 -11458  264 -11460 0
 11456  11457 -11458  264 -11461 0

c  0-1 --> -1
c    (-b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧ -p_264) -> ( b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0)
c  in CNF:
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨  b^{11, 25}_2
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_1
c     b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨  b^{11, 25}_0
c  in DIMACS:
 11456  11457  11458  264  11459 0
 11456  11457  11458  264 -11460 0
 11456  11457  11458  264  11461 0

c  -1-1 --> -2
c    ( b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧  b^{11, 24}_0 ∧ -p_264) -> ( b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0)
c  in CNF:
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨  b^{11, 25}_2
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨  b^{11, 25}_1
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨  p_264 ∨ -b^{11, 25}_0
c  in DIMACS:
-11456  11457 -11458  264  11459 0
-11456  11457 -11458  264  11460 0
-11456  11457 -11458  264 -11461 0

c  -2-1 --> break 
c    ( b^{11, 24}_2 ∧  b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨  b^{11, 24}_0 ∨  p_264 ∨ break
c  in DIMACS:
-11456 -11457  11458  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 24}_2 ∧ -b^{11, 24}_1 ∧ -b^{11, 24}_0 ∧ true) 
c  in CNF:
c    -b^{11, 24}_2 ∨  b^{11, 24}_1 ∨  b^{11, 24}_0 ∨ false 
c  in DIMACS:
-11456  11457  11458  0

c  3 does not represent an automaton state.
c    -(-b^{11, 24}_2 ∧  b^{11, 24}_1 ∧  b^{11, 24}_0 ∧ true) 
c  in CNF:
c     b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ false 
c  in DIMACS:
 11456 -11457 -11458  0
c  -3 does not represent an automaton state.
c    -( b^{11, 24}_2 ∧  b^{11, 24}_1 ∧  b^{11, 24}_0 ∧ true) 
c  in CNF:
c    -b^{11, 24}_2 ∨ -b^{11, 24}_1 ∨ -b^{11, 24}_0 ∨ false 
c  in DIMACS:
-11456 -11457 -11458  0

c i = 25
c  -2+1 --> -1
c    ( b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧  p_275) -> ( b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0)
c  in CNF:
c    -b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨  b^{11, 26}_2
c    -b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_1
c    -b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨  b^{11, 26}_0
c  in DIMACS:
-11459 -11460  11461 -275  11462 0
-11459 -11460  11461 -275 -11463 0
-11459 -11460  11461 -275  11464 0

c  -1+1 --> 0
c    ( b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0 ∧  p_275) -> (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧ -b^{11, 26}_0)
c  in CNF:
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_2
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_1
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_0
c  in DIMACS:
-11459  11460 -11461 -275 -11462 0
-11459  11460 -11461 -275 -11463 0
-11459  11460 -11461 -275 -11464 0

c  0+1 --> 1
c    (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧  p_275) -> (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0)
c  in CNF:
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_2
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_1
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨  b^{11, 26}_0
c  in DIMACS:
 11459  11460  11461 -275 -11462 0
 11459  11460  11461 -275 -11463 0
 11459  11460  11461 -275  11464 0

c  1+1 --> 2
c    (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0 ∧  p_275) -> (-b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0)
c  in CNF:
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_2
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨  b^{11, 26}_1
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ -p_275 ∨ -b^{11, 26}_0
c  in DIMACS:
 11459  11460 -11461 -275 -11462 0
 11459  11460 -11461 -275  11463 0
 11459  11460 -11461 -275 -11464 0

c  2+1 --> break 
c    (-b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧  p_275) -> break
c  in CNF:
c     b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 11459 -11460  11461 -275 1162 0


c  2-1 --> 1
c    (-b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧ -p_275) -> (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0)
c  in CNF:
c     b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_2
c     b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_1
c     b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨  b^{11, 26}_0
c  in DIMACS:
 11459 -11460  11461  275 -11462 0
 11459 -11460  11461  275 -11463 0
 11459 -11460  11461  275  11464 0

c  1-1 --> 0
c    (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0 ∧ -p_275) -> (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧ -b^{11, 26}_0)
c  in CNF:
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_2
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_1
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_0
c  in DIMACS:
 11459  11460 -11461  275 -11462 0
 11459  11460 -11461  275 -11463 0
 11459  11460 -11461  275 -11464 0

c  0-1 --> -1
c    (-b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧ -p_275) -> ( b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0)
c  in CNF:
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨  b^{11, 26}_2
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_1
c     b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨  b^{11, 26}_0
c  in DIMACS:
 11459  11460  11461  275  11462 0
 11459  11460  11461  275 -11463 0
 11459  11460  11461  275  11464 0

c  -1-1 --> -2
c    ( b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧  b^{11, 25}_0 ∧ -p_275) -> ( b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0)
c  in CNF:
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨  b^{11, 26}_2
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨  b^{11, 26}_1
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨  p_275 ∨ -b^{11, 26}_0
c  in DIMACS:
-11459  11460 -11461  275  11462 0
-11459  11460 -11461  275  11463 0
-11459  11460 -11461  275 -11464 0

c  -2-1 --> break 
c    ( b^{11, 25}_2 ∧  b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨  b^{11, 25}_0 ∨  p_275 ∨ break
c  in DIMACS:
-11459 -11460  11461  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 25}_2 ∧ -b^{11, 25}_1 ∧ -b^{11, 25}_0 ∧ true) 
c  in CNF:
c    -b^{11, 25}_2 ∨  b^{11, 25}_1 ∨  b^{11, 25}_0 ∨ false 
c  in DIMACS:
-11459  11460  11461  0

c  3 does not represent an automaton state.
c    -(-b^{11, 25}_2 ∧  b^{11, 25}_1 ∧  b^{11, 25}_0 ∧ true) 
c  in CNF:
c     b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ false 
c  in DIMACS:
 11459 -11460 -11461  0
c  -3 does not represent an automaton state.
c    -( b^{11, 25}_2 ∧  b^{11, 25}_1 ∧  b^{11, 25}_0 ∧ true) 
c  in CNF:
c    -b^{11, 25}_2 ∨ -b^{11, 25}_1 ∨ -b^{11, 25}_0 ∨ false 
c  in DIMACS:
-11459 -11460 -11461  0

c i = 26
c  -2+1 --> -1
c    ( b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧  p_286) -> ( b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0)
c  in CNF:
c    -b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨  b^{11, 27}_2
c    -b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_1
c    -b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨  b^{11, 27}_0
c  in DIMACS:
-11462 -11463  11464 -286  11465 0
-11462 -11463  11464 -286 -11466 0
-11462 -11463  11464 -286  11467 0

c  -1+1 --> 0
c    ( b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0 ∧  p_286) -> (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧ -b^{11, 27}_0)
c  in CNF:
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_2
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_1
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_0
c  in DIMACS:
-11462  11463 -11464 -286 -11465 0
-11462  11463 -11464 -286 -11466 0
-11462  11463 -11464 -286 -11467 0

c  0+1 --> 1
c    (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧  p_286) -> (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0)
c  in CNF:
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_2
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_1
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨  b^{11, 27}_0
c  in DIMACS:
 11462  11463  11464 -286 -11465 0
 11462  11463  11464 -286 -11466 0
 11462  11463  11464 -286  11467 0

c  1+1 --> 2
c    (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0 ∧  p_286) -> (-b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0)
c  in CNF:
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_2
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨  b^{11, 27}_1
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ -p_286 ∨ -b^{11, 27}_0
c  in DIMACS:
 11462  11463 -11464 -286 -11465 0
 11462  11463 -11464 -286  11466 0
 11462  11463 -11464 -286 -11467 0

c  2+1 --> break 
c    (-b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧  p_286) -> break
c  in CNF:
c     b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 11462 -11463  11464 -286 1162 0


c  2-1 --> 1
c    (-b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧ -p_286) -> (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0)
c  in CNF:
c     b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_2
c     b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_1
c     b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨  b^{11, 27}_0
c  in DIMACS:
 11462 -11463  11464  286 -11465 0
 11462 -11463  11464  286 -11466 0
 11462 -11463  11464  286  11467 0

c  1-1 --> 0
c    (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0 ∧ -p_286) -> (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧ -b^{11, 27}_0)
c  in CNF:
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_2
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_1
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_0
c  in DIMACS:
 11462  11463 -11464  286 -11465 0
 11462  11463 -11464  286 -11466 0
 11462  11463 -11464  286 -11467 0

c  0-1 --> -1
c    (-b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧ -p_286) -> ( b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0)
c  in CNF:
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨  b^{11, 27}_2
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_1
c     b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨  b^{11, 27}_0
c  in DIMACS:
 11462  11463  11464  286  11465 0
 11462  11463  11464  286 -11466 0
 11462  11463  11464  286  11467 0

c  -1-1 --> -2
c    ( b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧  b^{11, 26}_0 ∧ -p_286) -> ( b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0)
c  in CNF:
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨  b^{11, 27}_2
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨  b^{11, 27}_1
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨  p_286 ∨ -b^{11, 27}_0
c  in DIMACS:
-11462  11463 -11464  286  11465 0
-11462  11463 -11464  286  11466 0
-11462  11463 -11464  286 -11467 0

c  -2-1 --> break 
c    ( b^{11, 26}_2 ∧  b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨  b^{11, 26}_0 ∨  p_286 ∨ break
c  in DIMACS:
-11462 -11463  11464  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 26}_2 ∧ -b^{11, 26}_1 ∧ -b^{11, 26}_0 ∧ true) 
c  in CNF:
c    -b^{11, 26}_2 ∨  b^{11, 26}_1 ∨  b^{11, 26}_0 ∨ false 
c  in DIMACS:
-11462  11463  11464  0

c  3 does not represent an automaton state.
c    -(-b^{11, 26}_2 ∧  b^{11, 26}_1 ∧  b^{11, 26}_0 ∧ true) 
c  in CNF:
c     b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ false 
c  in DIMACS:
 11462 -11463 -11464  0
c  -3 does not represent an automaton state.
c    -( b^{11, 26}_2 ∧  b^{11, 26}_1 ∧  b^{11, 26}_0 ∧ true) 
c  in CNF:
c    -b^{11, 26}_2 ∨ -b^{11, 26}_1 ∨ -b^{11, 26}_0 ∨ false 
c  in DIMACS:
-11462 -11463 -11464  0

c i = 27
c  -2+1 --> -1
c    ( b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧  p_297) -> ( b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0)
c  in CNF:
c    -b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨  b^{11, 28}_2
c    -b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_1
c    -b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨  b^{11, 28}_0
c  in DIMACS:
-11465 -11466  11467 -297  11468 0
-11465 -11466  11467 -297 -11469 0
-11465 -11466  11467 -297  11470 0

c  -1+1 --> 0
c    ( b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0 ∧  p_297) -> (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧ -b^{11, 28}_0)
c  in CNF:
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_2
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_1
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_0
c  in DIMACS:
-11465  11466 -11467 -297 -11468 0
-11465  11466 -11467 -297 -11469 0
-11465  11466 -11467 -297 -11470 0

c  0+1 --> 1
c    (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧  p_297) -> (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0)
c  in CNF:
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_2
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_1
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨  b^{11, 28}_0
c  in DIMACS:
 11465  11466  11467 -297 -11468 0
 11465  11466  11467 -297 -11469 0
 11465  11466  11467 -297  11470 0

c  1+1 --> 2
c    (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0 ∧  p_297) -> (-b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0)
c  in CNF:
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_2
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨  b^{11, 28}_1
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ -p_297 ∨ -b^{11, 28}_0
c  in DIMACS:
 11465  11466 -11467 -297 -11468 0
 11465  11466 -11467 -297  11469 0
 11465  11466 -11467 -297 -11470 0

c  2+1 --> break 
c    (-b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧  p_297) -> break
c  in CNF:
c     b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 11465 -11466  11467 -297 1162 0


c  2-1 --> 1
c    (-b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧ -p_297) -> (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0)
c  in CNF:
c     b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_2
c     b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_1
c     b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨  b^{11, 28}_0
c  in DIMACS:
 11465 -11466  11467  297 -11468 0
 11465 -11466  11467  297 -11469 0
 11465 -11466  11467  297  11470 0

c  1-1 --> 0
c    (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0 ∧ -p_297) -> (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧ -b^{11, 28}_0)
c  in CNF:
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_2
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_1
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_0
c  in DIMACS:
 11465  11466 -11467  297 -11468 0
 11465  11466 -11467  297 -11469 0
 11465  11466 -11467  297 -11470 0

c  0-1 --> -1
c    (-b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧ -p_297) -> ( b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0)
c  in CNF:
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨  b^{11, 28}_2
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_1
c     b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨  b^{11, 28}_0
c  in DIMACS:
 11465  11466  11467  297  11468 0
 11465  11466  11467  297 -11469 0
 11465  11466  11467  297  11470 0

c  -1-1 --> -2
c    ( b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧  b^{11, 27}_0 ∧ -p_297) -> ( b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0)
c  in CNF:
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨  b^{11, 28}_2
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨  b^{11, 28}_1
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨  p_297 ∨ -b^{11, 28}_0
c  in DIMACS:
-11465  11466 -11467  297  11468 0
-11465  11466 -11467  297  11469 0
-11465  11466 -11467  297 -11470 0

c  -2-1 --> break 
c    ( b^{11, 27}_2 ∧  b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨  b^{11, 27}_0 ∨  p_297 ∨ break
c  in DIMACS:
-11465 -11466  11467  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 27}_2 ∧ -b^{11, 27}_1 ∧ -b^{11, 27}_0 ∧ true) 
c  in CNF:
c    -b^{11, 27}_2 ∨  b^{11, 27}_1 ∨  b^{11, 27}_0 ∨ false 
c  in DIMACS:
-11465  11466  11467  0

c  3 does not represent an automaton state.
c    -(-b^{11, 27}_2 ∧  b^{11, 27}_1 ∧  b^{11, 27}_0 ∧ true) 
c  in CNF:
c     b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ false 
c  in DIMACS:
 11465 -11466 -11467  0
c  -3 does not represent an automaton state.
c    -( b^{11, 27}_2 ∧  b^{11, 27}_1 ∧  b^{11, 27}_0 ∧ true) 
c  in CNF:
c    -b^{11, 27}_2 ∨ -b^{11, 27}_1 ∨ -b^{11, 27}_0 ∨ false 
c  in DIMACS:
-11465 -11466 -11467  0

c i = 28
c  -2+1 --> -1
c    ( b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧  p_308) -> ( b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0)
c  in CNF:
c    -b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨  b^{11, 29}_2
c    -b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_1
c    -b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨  b^{11, 29}_0
c  in DIMACS:
-11468 -11469  11470 -308  11471 0
-11468 -11469  11470 -308 -11472 0
-11468 -11469  11470 -308  11473 0

c  -1+1 --> 0
c    ( b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0 ∧  p_308) -> (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧ -b^{11, 29}_0)
c  in CNF:
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_2
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_1
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_0
c  in DIMACS:
-11468  11469 -11470 -308 -11471 0
-11468  11469 -11470 -308 -11472 0
-11468  11469 -11470 -308 -11473 0

c  0+1 --> 1
c    (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧  p_308) -> (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0)
c  in CNF:
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_2
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_1
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨  b^{11, 29}_0
c  in DIMACS:
 11468  11469  11470 -308 -11471 0
 11468  11469  11470 -308 -11472 0
 11468  11469  11470 -308  11473 0

c  1+1 --> 2
c    (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0 ∧  p_308) -> (-b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0)
c  in CNF:
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_2
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨  b^{11, 29}_1
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ -p_308 ∨ -b^{11, 29}_0
c  in DIMACS:
 11468  11469 -11470 -308 -11471 0
 11468  11469 -11470 -308  11472 0
 11468  11469 -11470 -308 -11473 0

c  2+1 --> break 
c    (-b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧  p_308) -> break
c  in CNF:
c     b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 11468 -11469  11470 -308 1162 0


c  2-1 --> 1
c    (-b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧ -p_308) -> (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0)
c  in CNF:
c     b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_2
c     b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_1
c     b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨  b^{11, 29}_0
c  in DIMACS:
 11468 -11469  11470  308 -11471 0
 11468 -11469  11470  308 -11472 0
 11468 -11469  11470  308  11473 0

c  1-1 --> 0
c    (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0 ∧ -p_308) -> (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧ -b^{11, 29}_0)
c  in CNF:
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_2
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_1
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_0
c  in DIMACS:
 11468  11469 -11470  308 -11471 0
 11468  11469 -11470  308 -11472 0
 11468  11469 -11470  308 -11473 0

c  0-1 --> -1
c    (-b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧ -p_308) -> ( b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0)
c  in CNF:
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨  b^{11, 29}_2
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_1
c     b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨  b^{11, 29}_0
c  in DIMACS:
 11468  11469  11470  308  11471 0
 11468  11469  11470  308 -11472 0
 11468  11469  11470  308  11473 0

c  -1-1 --> -2
c    ( b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧  b^{11, 28}_0 ∧ -p_308) -> ( b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0)
c  in CNF:
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨  b^{11, 29}_2
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨  b^{11, 29}_1
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨  p_308 ∨ -b^{11, 29}_0
c  in DIMACS:
-11468  11469 -11470  308  11471 0
-11468  11469 -11470  308  11472 0
-11468  11469 -11470  308 -11473 0

c  -2-1 --> break 
c    ( b^{11, 28}_2 ∧  b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨  b^{11, 28}_0 ∨  p_308 ∨ break
c  in DIMACS:
-11468 -11469  11470  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 28}_2 ∧ -b^{11, 28}_1 ∧ -b^{11, 28}_0 ∧ true) 
c  in CNF:
c    -b^{11, 28}_2 ∨  b^{11, 28}_1 ∨  b^{11, 28}_0 ∨ false 
c  in DIMACS:
-11468  11469  11470  0

c  3 does not represent an automaton state.
c    -(-b^{11, 28}_2 ∧  b^{11, 28}_1 ∧  b^{11, 28}_0 ∧ true) 
c  in CNF:
c     b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ false 
c  in DIMACS:
 11468 -11469 -11470  0
c  -3 does not represent an automaton state.
c    -( b^{11, 28}_2 ∧  b^{11, 28}_1 ∧  b^{11, 28}_0 ∧ true) 
c  in CNF:
c    -b^{11, 28}_2 ∨ -b^{11, 28}_1 ∨ -b^{11, 28}_0 ∨ false 
c  in DIMACS:
-11468 -11469 -11470  0

c i = 29
c  -2+1 --> -1
c    ( b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧  p_319) -> ( b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0)
c  in CNF:
c    -b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨  b^{11, 30}_2
c    -b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_1
c    -b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨  b^{11, 30}_0
c  in DIMACS:
-11471 -11472  11473 -319  11474 0
-11471 -11472  11473 -319 -11475 0
-11471 -11472  11473 -319  11476 0

c  -1+1 --> 0
c    ( b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0 ∧  p_319) -> (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧ -b^{11, 30}_0)
c  in CNF:
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_2
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_1
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_0
c  in DIMACS:
-11471  11472 -11473 -319 -11474 0
-11471  11472 -11473 -319 -11475 0
-11471  11472 -11473 -319 -11476 0

c  0+1 --> 1
c    (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧  p_319) -> (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0)
c  in CNF:
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_2
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_1
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨  b^{11, 30}_0
c  in DIMACS:
 11471  11472  11473 -319 -11474 0
 11471  11472  11473 -319 -11475 0
 11471  11472  11473 -319  11476 0

c  1+1 --> 2
c    (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0 ∧  p_319) -> (-b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0)
c  in CNF:
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_2
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨  b^{11, 30}_1
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ -p_319 ∨ -b^{11, 30}_0
c  in DIMACS:
 11471  11472 -11473 -319 -11474 0
 11471  11472 -11473 -319  11475 0
 11471  11472 -11473 -319 -11476 0

c  2+1 --> break 
c    (-b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧  p_319) -> break
c  in CNF:
c     b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ -p_319 ∨ break
c  in DIMACS:
 11471 -11472  11473 -319 1162 0


c  2-1 --> 1
c    (-b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧ -p_319) -> (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0)
c  in CNF:
c     b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_2
c     b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_1
c     b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨  b^{11, 30}_0
c  in DIMACS:
 11471 -11472  11473  319 -11474 0
 11471 -11472  11473  319 -11475 0
 11471 -11472  11473  319  11476 0

c  1-1 --> 0
c    (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0 ∧ -p_319) -> (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧ -b^{11, 30}_0)
c  in CNF:
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_2
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_1
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_0
c  in DIMACS:
 11471  11472 -11473  319 -11474 0
 11471  11472 -11473  319 -11475 0
 11471  11472 -11473  319 -11476 0

c  0-1 --> -1
c    (-b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧ -p_319) -> ( b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0)
c  in CNF:
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨  b^{11, 30}_2
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_1
c     b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨  b^{11, 30}_0
c  in DIMACS:
 11471  11472  11473  319  11474 0
 11471  11472  11473  319 -11475 0
 11471  11472  11473  319  11476 0

c  -1-1 --> -2
c    ( b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧  b^{11, 29}_0 ∧ -p_319) -> ( b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0)
c  in CNF:
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨  b^{11, 30}_2
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨  b^{11, 30}_1
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨  p_319 ∨ -b^{11, 30}_0
c  in DIMACS:
-11471  11472 -11473  319  11474 0
-11471  11472 -11473  319  11475 0
-11471  11472 -11473  319 -11476 0

c  -2-1 --> break 
c    ( b^{11, 29}_2 ∧  b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧ -p_319) -> break
c  in CNF:
c    -b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨  b^{11, 29}_0 ∨  p_319 ∨ break
c  in DIMACS:
-11471 -11472  11473  319 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 29}_2 ∧ -b^{11, 29}_1 ∧ -b^{11, 29}_0 ∧ true) 
c  in CNF:
c    -b^{11, 29}_2 ∨  b^{11, 29}_1 ∨  b^{11, 29}_0 ∨ false 
c  in DIMACS:
-11471  11472  11473  0

c  3 does not represent an automaton state.
c    -(-b^{11, 29}_2 ∧  b^{11, 29}_1 ∧  b^{11, 29}_0 ∧ true) 
c  in CNF:
c     b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ false 
c  in DIMACS:
 11471 -11472 -11473  0
c  -3 does not represent an automaton state.
c    -( b^{11, 29}_2 ∧  b^{11, 29}_1 ∧  b^{11, 29}_0 ∧ true) 
c  in CNF:
c    -b^{11, 29}_2 ∨ -b^{11, 29}_1 ∨ -b^{11, 29}_0 ∨ false 
c  in DIMACS:
-11471 -11472 -11473  0

c i = 30
c  -2+1 --> -1
c    ( b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧  p_330) -> ( b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0)
c  in CNF:
c    -b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨  b^{11, 31}_2
c    -b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_1
c    -b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨  b^{11, 31}_0
c  in DIMACS:
-11474 -11475  11476 -330  11477 0
-11474 -11475  11476 -330 -11478 0
-11474 -11475  11476 -330  11479 0

c  -1+1 --> 0
c    ( b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0 ∧  p_330) -> (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧ -b^{11, 31}_0)
c  in CNF:
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_2
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_1
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_0
c  in DIMACS:
-11474  11475 -11476 -330 -11477 0
-11474  11475 -11476 -330 -11478 0
-11474  11475 -11476 -330 -11479 0

c  0+1 --> 1
c    (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧  p_330) -> (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0)
c  in CNF:
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_2
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_1
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨  b^{11, 31}_0
c  in DIMACS:
 11474  11475  11476 -330 -11477 0
 11474  11475  11476 -330 -11478 0
 11474  11475  11476 -330  11479 0

c  1+1 --> 2
c    (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0 ∧  p_330) -> (-b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0)
c  in CNF:
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_2
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨  b^{11, 31}_1
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ -p_330 ∨ -b^{11, 31}_0
c  in DIMACS:
 11474  11475 -11476 -330 -11477 0
 11474  11475 -11476 -330  11478 0
 11474  11475 -11476 -330 -11479 0

c  2+1 --> break 
c    (-b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧  p_330) -> break
c  in CNF:
c     b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 11474 -11475  11476 -330 1162 0


c  2-1 --> 1
c    (-b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧ -p_330) -> (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0)
c  in CNF:
c     b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_2
c     b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_1
c     b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨  b^{11, 31}_0
c  in DIMACS:
 11474 -11475  11476  330 -11477 0
 11474 -11475  11476  330 -11478 0
 11474 -11475  11476  330  11479 0

c  1-1 --> 0
c    (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0 ∧ -p_330) -> (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧ -b^{11, 31}_0)
c  in CNF:
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_2
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_1
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_0
c  in DIMACS:
 11474  11475 -11476  330 -11477 0
 11474  11475 -11476  330 -11478 0
 11474  11475 -11476  330 -11479 0

c  0-1 --> -1
c    (-b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧ -p_330) -> ( b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0)
c  in CNF:
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨  b^{11, 31}_2
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_1
c     b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨  b^{11, 31}_0
c  in DIMACS:
 11474  11475  11476  330  11477 0
 11474  11475  11476  330 -11478 0
 11474  11475  11476  330  11479 0

c  -1-1 --> -2
c    ( b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧  b^{11, 30}_0 ∧ -p_330) -> ( b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0)
c  in CNF:
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨  b^{11, 31}_2
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨  b^{11, 31}_1
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨  p_330 ∨ -b^{11, 31}_0
c  in DIMACS:
-11474  11475 -11476  330  11477 0
-11474  11475 -11476  330  11478 0
-11474  11475 -11476  330 -11479 0

c  -2-1 --> break 
c    ( b^{11, 30}_2 ∧  b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨  b^{11, 30}_0 ∨  p_330 ∨ break
c  in DIMACS:
-11474 -11475  11476  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 30}_2 ∧ -b^{11, 30}_1 ∧ -b^{11, 30}_0 ∧ true) 
c  in CNF:
c    -b^{11, 30}_2 ∨  b^{11, 30}_1 ∨  b^{11, 30}_0 ∨ false 
c  in DIMACS:
-11474  11475  11476  0

c  3 does not represent an automaton state.
c    -(-b^{11, 30}_2 ∧  b^{11, 30}_1 ∧  b^{11, 30}_0 ∧ true) 
c  in CNF:
c     b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ false 
c  in DIMACS:
 11474 -11475 -11476  0
c  -3 does not represent an automaton state.
c    -( b^{11, 30}_2 ∧  b^{11, 30}_1 ∧  b^{11, 30}_0 ∧ true) 
c  in CNF:
c    -b^{11, 30}_2 ∨ -b^{11, 30}_1 ∨ -b^{11, 30}_0 ∨ false 
c  in DIMACS:
-11474 -11475 -11476  0

c i = 31
c  -2+1 --> -1
c    ( b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧  p_341) -> ( b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0)
c  in CNF:
c    -b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨  b^{11, 32}_2
c    -b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_1
c    -b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨  b^{11, 32}_0
c  in DIMACS:
-11477 -11478  11479 -341  11480 0
-11477 -11478  11479 -341 -11481 0
-11477 -11478  11479 -341  11482 0

c  -1+1 --> 0
c    ( b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0 ∧  p_341) -> (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧ -b^{11, 32}_0)
c  in CNF:
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_2
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_1
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_0
c  in DIMACS:
-11477  11478 -11479 -341 -11480 0
-11477  11478 -11479 -341 -11481 0
-11477  11478 -11479 -341 -11482 0

c  0+1 --> 1
c    (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧  p_341) -> (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0)
c  in CNF:
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_2
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_1
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨  b^{11, 32}_0
c  in DIMACS:
 11477  11478  11479 -341 -11480 0
 11477  11478  11479 -341 -11481 0
 11477  11478  11479 -341  11482 0

c  1+1 --> 2
c    (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0 ∧  p_341) -> (-b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0)
c  in CNF:
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_2
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨  b^{11, 32}_1
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ -p_341 ∨ -b^{11, 32}_0
c  in DIMACS:
 11477  11478 -11479 -341 -11480 0
 11477  11478 -11479 -341  11481 0
 11477  11478 -11479 -341 -11482 0

c  2+1 --> break 
c    (-b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧  p_341) -> break
c  in CNF:
c     b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ -p_341 ∨ break
c  in DIMACS:
 11477 -11478  11479 -341 1162 0


c  2-1 --> 1
c    (-b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧ -p_341) -> (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0)
c  in CNF:
c     b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_2
c     b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_1
c     b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨  b^{11, 32}_0
c  in DIMACS:
 11477 -11478  11479  341 -11480 0
 11477 -11478  11479  341 -11481 0
 11477 -11478  11479  341  11482 0

c  1-1 --> 0
c    (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0 ∧ -p_341) -> (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧ -b^{11, 32}_0)
c  in CNF:
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_2
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_1
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_0
c  in DIMACS:
 11477  11478 -11479  341 -11480 0
 11477  11478 -11479  341 -11481 0
 11477  11478 -11479  341 -11482 0

c  0-1 --> -1
c    (-b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧ -p_341) -> ( b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0)
c  in CNF:
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨  b^{11, 32}_2
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_1
c     b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨  b^{11, 32}_0
c  in DIMACS:
 11477  11478  11479  341  11480 0
 11477  11478  11479  341 -11481 0
 11477  11478  11479  341  11482 0

c  -1-1 --> -2
c    ( b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧  b^{11, 31}_0 ∧ -p_341) -> ( b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0)
c  in CNF:
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨  b^{11, 32}_2
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨  b^{11, 32}_1
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨  p_341 ∨ -b^{11, 32}_0
c  in DIMACS:
-11477  11478 -11479  341  11480 0
-11477  11478 -11479  341  11481 0
-11477  11478 -11479  341 -11482 0

c  -2-1 --> break 
c    ( b^{11, 31}_2 ∧  b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧ -p_341) -> break
c  in CNF:
c    -b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨  b^{11, 31}_0 ∨  p_341 ∨ break
c  in DIMACS:
-11477 -11478  11479  341 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 31}_2 ∧ -b^{11, 31}_1 ∧ -b^{11, 31}_0 ∧ true) 
c  in CNF:
c    -b^{11, 31}_2 ∨  b^{11, 31}_1 ∨  b^{11, 31}_0 ∨ false 
c  in DIMACS:
-11477  11478  11479  0

c  3 does not represent an automaton state.
c    -(-b^{11, 31}_2 ∧  b^{11, 31}_1 ∧  b^{11, 31}_0 ∧ true) 
c  in CNF:
c     b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ false 
c  in DIMACS:
 11477 -11478 -11479  0
c  -3 does not represent an automaton state.
c    -( b^{11, 31}_2 ∧  b^{11, 31}_1 ∧  b^{11, 31}_0 ∧ true) 
c  in CNF:
c    -b^{11, 31}_2 ∨ -b^{11, 31}_1 ∨ -b^{11, 31}_0 ∨ false 
c  in DIMACS:
-11477 -11478 -11479  0

c i = 32
c  -2+1 --> -1
c    ( b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧  p_352) -> ( b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0)
c  in CNF:
c    -b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨  b^{11, 33}_2
c    -b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_1
c    -b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨  b^{11, 33}_0
c  in DIMACS:
-11480 -11481  11482 -352  11483 0
-11480 -11481  11482 -352 -11484 0
-11480 -11481  11482 -352  11485 0

c  -1+1 --> 0
c    ( b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0 ∧  p_352) -> (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧ -b^{11, 33}_0)
c  in CNF:
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_2
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_1
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_0
c  in DIMACS:
-11480  11481 -11482 -352 -11483 0
-11480  11481 -11482 -352 -11484 0
-11480  11481 -11482 -352 -11485 0

c  0+1 --> 1
c    (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧  p_352) -> (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0)
c  in CNF:
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_2
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_1
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨  b^{11, 33}_0
c  in DIMACS:
 11480  11481  11482 -352 -11483 0
 11480  11481  11482 -352 -11484 0
 11480  11481  11482 -352  11485 0

c  1+1 --> 2
c    (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0 ∧  p_352) -> (-b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0)
c  in CNF:
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_2
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨  b^{11, 33}_1
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ -p_352 ∨ -b^{11, 33}_0
c  in DIMACS:
 11480  11481 -11482 -352 -11483 0
 11480  11481 -11482 -352  11484 0
 11480  11481 -11482 -352 -11485 0

c  2+1 --> break 
c    (-b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧  p_352) -> break
c  in CNF:
c     b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 11480 -11481  11482 -352 1162 0


c  2-1 --> 1
c    (-b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧ -p_352) -> (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0)
c  in CNF:
c     b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_2
c     b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_1
c     b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨  b^{11, 33}_0
c  in DIMACS:
 11480 -11481  11482  352 -11483 0
 11480 -11481  11482  352 -11484 0
 11480 -11481  11482  352  11485 0

c  1-1 --> 0
c    (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0 ∧ -p_352) -> (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧ -b^{11, 33}_0)
c  in CNF:
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_2
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_1
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_0
c  in DIMACS:
 11480  11481 -11482  352 -11483 0
 11480  11481 -11482  352 -11484 0
 11480  11481 -11482  352 -11485 0

c  0-1 --> -1
c    (-b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧ -p_352) -> ( b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0)
c  in CNF:
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨  b^{11, 33}_2
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_1
c     b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨  b^{11, 33}_0
c  in DIMACS:
 11480  11481  11482  352  11483 0
 11480  11481  11482  352 -11484 0
 11480  11481  11482  352  11485 0

c  -1-1 --> -2
c    ( b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧  b^{11, 32}_0 ∧ -p_352) -> ( b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0)
c  in CNF:
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨  b^{11, 33}_2
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨  b^{11, 33}_1
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨  p_352 ∨ -b^{11, 33}_0
c  in DIMACS:
-11480  11481 -11482  352  11483 0
-11480  11481 -11482  352  11484 0
-11480  11481 -11482  352 -11485 0

c  -2-1 --> break 
c    ( b^{11, 32}_2 ∧  b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨  b^{11, 32}_0 ∨  p_352 ∨ break
c  in DIMACS:
-11480 -11481  11482  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 32}_2 ∧ -b^{11, 32}_1 ∧ -b^{11, 32}_0 ∧ true) 
c  in CNF:
c    -b^{11, 32}_2 ∨  b^{11, 32}_1 ∨  b^{11, 32}_0 ∨ false 
c  in DIMACS:
-11480  11481  11482  0

c  3 does not represent an automaton state.
c    -(-b^{11, 32}_2 ∧  b^{11, 32}_1 ∧  b^{11, 32}_0 ∧ true) 
c  in CNF:
c     b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ false 
c  in DIMACS:
 11480 -11481 -11482  0
c  -3 does not represent an automaton state.
c    -( b^{11, 32}_2 ∧  b^{11, 32}_1 ∧  b^{11, 32}_0 ∧ true) 
c  in CNF:
c    -b^{11, 32}_2 ∨ -b^{11, 32}_1 ∨ -b^{11, 32}_0 ∨ false 
c  in DIMACS:
-11480 -11481 -11482  0

c i = 33
c  -2+1 --> -1
c    ( b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧  p_363) -> ( b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0)
c  in CNF:
c    -b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨  b^{11, 34}_2
c    -b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_1
c    -b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨  b^{11, 34}_0
c  in DIMACS:
-11483 -11484  11485 -363  11486 0
-11483 -11484  11485 -363 -11487 0
-11483 -11484  11485 -363  11488 0

c  -1+1 --> 0
c    ( b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0 ∧  p_363) -> (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧ -b^{11, 34}_0)
c  in CNF:
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_2
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_1
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_0
c  in DIMACS:
-11483  11484 -11485 -363 -11486 0
-11483  11484 -11485 -363 -11487 0
-11483  11484 -11485 -363 -11488 0

c  0+1 --> 1
c    (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧  p_363) -> (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0)
c  in CNF:
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_2
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_1
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨  b^{11, 34}_0
c  in DIMACS:
 11483  11484  11485 -363 -11486 0
 11483  11484  11485 -363 -11487 0
 11483  11484  11485 -363  11488 0

c  1+1 --> 2
c    (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0 ∧  p_363) -> (-b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0)
c  in CNF:
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_2
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨  b^{11, 34}_1
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ -p_363 ∨ -b^{11, 34}_0
c  in DIMACS:
 11483  11484 -11485 -363 -11486 0
 11483  11484 -11485 -363  11487 0
 11483  11484 -11485 -363 -11488 0

c  2+1 --> break 
c    (-b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧  p_363) -> break
c  in CNF:
c     b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 11483 -11484  11485 -363 1162 0


c  2-1 --> 1
c    (-b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧ -p_363) -> (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0)
c  in CNF:
c     b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_2
c     b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_1
c     b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨  b^{11, 34}_0
c  in DIMACS:
 11483 -11484  11485  363 -11486 0
 11483 -11484  11485  363 -11487 0
 11483 -11484  11485  363  11488 0

c  1-1 --> 0
c    (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0 ∧ -p_363) -> (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧ -b^{11, 34}_0)
c  in CNF:
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_2
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_1
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_0
c  in DIMACS:
 11483  11484 -11485  363 -11486 0
 11483  11484 -11485  363 -11487 0
 11483  11484 -11485  363 -11488 0

c  0-1 --> -1
c    (-b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧ -p_363) -> ( b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0)
c  in CNF:
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨  b^{11, 34}_2
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_1
c     b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨  b^{11, 34}_0
c  in DIMACS:
 11483  11484  11485  363  11486 0
 11483  11484  11485  363 -11487 0
 11483  11484  11485  363  11488 0

c  -1-1 --> -2
c    ( b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧  b^{11, 33}_0 ∧ -p_363) -> ( b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0)
c  in CNF:
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨  b^{11, 34}_2
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨  b^{11, 34}_1
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨  p_363 ∨ -b^{11, 34}_0
c  in DIMACS:
-11483  11484 -11485  363  11486 0
-11483  11484 -11485  363  11487 0
-11483  11484 -11485  363 -11488 0

c  -2-1 --> break 
c    ( b^{11, 33}_2 ∧  b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨  b^{11, 33}_0 ∨  p_363 ∨ break
c  in DIMACS:
-11483 -11484  11485  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 33}_2 ∧ -b^{11, 33}_1 ∧ -b^{11, 33}_0 ∧ true) 
c  in CNF:
c    -b^{11, 33}_2 ∨  b^{11, 33}_1 ∨  b^{11, 33}_0 ∨ false 
c  in DIMACS:
-11483  11484  11485  0

c  3 does not represent an automaton state.
c    -(-b^{11, 33}_2 ∧  b^{11, 33}_1 ∧  b^{11, 33}_0 ∧ true) 
c  in CNF:
c     b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ false 
c  in DIMACS:
 11483 -11484 -11485  0
c  -3 does not represent an automaton state.
c    -( b^{11, 33}_2 ∧  b^{11, 33}_1 ∧  b^{11, 33}_0 ∧ true) 
c  in CNF:
c    -b^{11, 33}_2 ∨ -b^{11, 33}_1 ∨ -b^{11, 33}_0 ∨ false 
c  in DIMACS:
-11483 -11484 -11485  0

c i = 34
c  -2+1 --> -1
c    ( b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧  p_374) -> ( b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0)
c  in CNF:
c    -b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨  b^{11, 35}_2
c    -b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_1
c    -b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨  b^{11, 35}_0
c  in DIMACS:
-11486 -11487  11488 -374  11489 0
-11486 -11487  11488 -374 -11490 0
-11486 -11487  11488 -374  11491 0

c  -1+1 --> 0
c    ( b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0 ∧  p_374) -> (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧ -b^{11, 35}_0)
c  in CNF:
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_2
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_1
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_0
c  in DIMACS:
-11486  11487 -11488 -374 -11489 0
-11486  11487 -11488 -374 -11490 0
-11486  11487 -11488 -374 -11491 0

c  0+1 --> 1
c    (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧  p_374) -> (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0)
c  in CNF:
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_2
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_1
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨  b^{11, 35}_0
c  in DIMACS:
 11486  11487  11488 -374 -11489 0
 11486  11487  11488 -374 -11490 0
 11486  11487  11488 -374  11491 0

c  1+1 --> 2
c    (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0 ∧  p_374) -> (-b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0)
c  in CNF:
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_2
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨  b^{11, 35}_1
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ -p_374 ∨ -b^{11, 35}_0
c  in DIMACS:
 11486  11487 -11488 -374 -11489 0
 11486  11487 -11488 -374  11490 0
 11486  11487 -11488 -374 -11491 0

c  2+1 --> break 
c    (-b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧  p_374) -> break
c  in CNF:
c     b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 11486 -11487  11488 -374 1162 0


c  2-1 --> 1
c    (-b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧ -p_374) -> (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0)
c  in CNF:
c     b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_2
c     b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_1
c     b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨  b^{11, 35}_0
c  in DIMACS:
 11486 -11487  11488  374 -11489 0
 11486 -11487  11488  374 -11490 0
 11486 -11487  11488  374  11491 0

c  1-1 --> 0
c    (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0 ∧ -p_374) -> (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧ -b^{11, 35}_0)
c  in CNF:
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_2
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_1
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_0
c  in DIMACS:
 11486  11487 -11488  374 -11489 0
 11486  11487 -11488  374 -11490 0
 11486  11487 -11488  374 -11491 0

c  0-1 --> -1
c    (-b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧ -p_374) -> ( b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0)
c  in CNF:
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨  b^{11, 35}_2
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_1
c     b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨  b^{11, 35}_0
c  in DIMACS:
 11486  11487  11488  374  11489 0
 11486  11487  11488  374 -11490 0
 11486  11487  11488  374  11491 0

c  -1-1 --> -2
c    ( b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧  b^{11, 34}_0 ∧ -p_374) -> ( b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0)
c  in CNF:
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨  b^{11, 35}_2
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨  b^{11, 35}_1
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨  p_374 ∨ -b^{11, 35}_0
c  in DIMACS:
-11486  11487 -11488  374  11489 0
-11486  11487 -11488  374  11490 0
-11486  11487 -11488  374 -11491 0

c  -2-1 --> break 
c    ( b^{11, 34}_2 ∧  b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨  b^{11, 34}_0 ∨  p_374 ∨ break
c  in DIMACS:
-11486 -11487  11488  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 34}_2 ∧ -b^{11, 34}_1 ∧ -b^{11, 34}_0 ∧ true) 
c  in CNF:
c    -b^{11, 34}_2 ∨  b^{11, 34}_1 ∨  b^{11, 34}_0 ∨ false 
c  in DIMACS:
-11486  11487  11488  0

c  3 does not represent an automaton state.
c    -(-b^{11, 34}_2 ∧  b^{11, 34}_1 ∧  b^{11, 34}_0 ∧ true) 
c  in CNF:
c     b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ false 
c  in DIMACS:
 11486 -11487 -11488  0
c  -3 does not represent an automaton state.
c    -( b^{11, 34}_2 ∧  b^{11, 34}_1 ∧  b^{11, 34}_0 ∧ true) 
c  in CNF:
c    -b^{11, 34}_2 ∨ -b^{11, 34}_1 ∨ -b^{11, 34}_0 ∨ false 
c  in DIMACS:
-11486 -11487 -11488  0

c i = 35
c  -2+1 --> -1
c    ( b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧  p_385) -> ( b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0)
c  in CNF:
c    -b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨  b^{11, 36}_2
c    -b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_1
c    -b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨  b^{11, 36}_0
c  in DIMACS:
-11489 -11490  11491 -385  11492 0
-11489 -11490  11491 -385 -11493 0
-11489 -11490  11491 -385  11494 0

c  -1+1 --> 0
c    ( b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0 ∧  p_385) -> (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧ -b^{11, 36}_0)
c  in CNF:
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_2
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_1
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_0
c  in DIMACS:
-11489  11490 -11491 -385 -11492 0
-11489  11490 -11491 -385 -11493 0
-11489  11490 -11491 -385 -11494 0

c  0+1 --> 1
c    (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧  p_385) -> (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0)
c  in CNF:
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_2
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_1
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨  b^{11, 36}_0
c  in DIMACS:
 11489  11490  11491 -385 -11492 0
 11489  11490  11491 -385 -11493 0
 11489  11490  11491 -385  11494 0

c  1+1 --> 2
c    (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0 ∧  p_385) -> (-b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0)
c  in CNF:
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_2
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨  b^{11, 36}_1
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ -p_385 ∨ -b^{11, 36}_0
c  in DIMACS:
 11489  11490 -11491 -385 -11492 0
 11489  11490 -11491 -385  11493 0
 11489  11490 -11491 -385 -11494 0

c  2+1 --> break 
c    (-b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧  p_385) -> break
c  in CNF:
c     b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 11489 -11490  11491 -385 1162 0


c  2-1 --> 1
c    (-b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧ -p_385) -> (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0)
c  in CNF:
c     b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_2
c     b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_1
c     b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨  b^{11, 36}_0
c  in DIMACS:
 11489 -11490  11491  385 -11492 0
 11489 -11490  11491  385 -11493 0
 11489 -11490  11491  385  11494 0

c  1-1 --> 0
c    (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0 ∧ -p_385) -> (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧ -b^{11, 36}_0)
c  in CNF:
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_2
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_1
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_0
c  in DIMACS:
 11489  11490 -11491  385 -11492 0
 11489  11490 -11491  385 -11493 0
 11489  11490 -11491  385 -11494 0

c  0-1 --> -1
c    (-b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧ -p_385) -> ( b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0)
c  in CNF:
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨  b^{11, 36}_2
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_1
c     b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨  b^{11, 36}_0
c  in DIMACS:
 11489  11490  11491  385  11492 0
 11489  11490  11491  385 -11493 0
 11489  11490  11491  385  11494 0

c  -1-1 --> -2
c    ( b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧  b^{11, 35}_0 ∧ -p_385) -> ( b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0)
c  in CNF:
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨  b^{11, 36}_2
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨  b^{11, 36}_1
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨  p_385 ∨ -b^{11, 36}_0
c  in DIMACS:
-11489  11490 -11491  385  11492 0
-11489  11490 -11491  385  11493 0
-11489  11490 -11491  385 -11494 0

c  -2-1 --> break 
c    ( b^{11, 35}_2 ∧  b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨  b^{11, 35}_0 ∨  p_385 ∨ break
c  in DIMACS:
-11489 -11490  11491  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 35}_2 ∧ -b^{11, 35}_1 ∧ -b^{11, 35}_0 ∧ true) 
c  in CNF:
c    -b^{11, 35}_2 ∨  b^{11, 35}_1 ∨  b^{11, 35}_0 ∨ false 
c  in DIMACS:
-11489  11490  11491  0

c  3 does not represent an automaton state.
c    -(-b^{11, 35}_2 ∧  b^{11, 35}_1 ∧  b^{11, 35}_0 ∧ true) 
c  in CNF:
c     b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ false 
c  in DIMACS:
 11489 -11490 -11491  0
c  -3 does not represent an automaton state.
c    -( b^{11, 35}_2 ∧  b^{11, 35}_1 ∧  b^{11, 35}_0 ∧ true) 
c  in CNF:
c    -b^{11, 35}_2 ∨ -b^{11, 35}_1 ∨ -b^{11, 35}_0 ∨ false 
c  in DIMACS:
-11489 -11490 -11491  0

c i = 36
c  -2+1 --> -1
c    ( b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧  p_396) -> ( b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0)
c  in CNF:
c    -b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨  b^{11, 37}_2
c    -b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_1
c    -b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨  b^{11, 37}_0
c  in DIMACS:
-11492 -11493  11494 -396  11495 0
-11492 -11493  11494 -396 -11496 0
-11492 -11493  11494 -396  11497 0

c  -1+1 --> 0
c    ( b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0 ∧  p_396) -> (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧ -b^{11, 37}_0)
c  in CNF:
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_2
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_1
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_0
c  in DIMACS:
-11492  11493 -11494 -396 -11495 0
-11492  11493 -11494 -396 -11496 0
-11492  11493 -11494 -396 -11497 0

c  0+1 --> 1
c    (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧  p_396) -> (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0)
c  in CNF:
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_2
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_1
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨  b^{11, 37}_0
c  in DIMACS:
 11492  11493  11494 -396 -11495 0
 11492  11493  11494 -396 -11496 0
 11492  11493  11494 -396  11497 0

c  1+1 --> 2
c    (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0 ∧  p_396) -> (-b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0)
c  in CNF:
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_2
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨  b^{11, 37}_1
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ -p_396 ∨ -b^{11, 37}_0
c  in DIMACS:
 11492  11493 -11494 -396 -11495 0
 11492  11493 -11494 -396  11496 0
 11492  11493 -11494 -396 -11497 0

c  2+1 --> break 
c    (-b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧  p_396) -> break
c  in CNF:
c     b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 11492 -11493  11494 -396 1162 0


c  2-1 --> 1
c    (-b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧ -p_396) -> (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0)
c  in CNF:
c     b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_2
c     b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_1
c     b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨  b^{11, 37}_0
c  in DIMACS:
 11492 -11493  11494  396 -11495 0
 11492 -11493  11494  396 -11496 0
 11492 -11493  11494  396  11497 0

c  1-1 --> 0
c    (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0 ∧ -p_396) -> (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧ -b^{11, 37}_0)
c  in CNF:
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_2
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_1
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_0
c  in DIMACS:
 11492  11493 -11494  396 -11495 0
 11492  11493 -11494  396 -11496 0
 11492  11493 -11494  396 -11497 0

c  0-1 --> -1
c    (-b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧ -p_396) -> ( b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0)
c  in CNF:
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨  b^{11, 37}_2
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_1
c     b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨  b^{11, 37}_0
c  in DIMACS:
 11492  11493  11494  396  11495 0
 11492  11493  11494  396 -11496 0
 11492  11493  11494  396  11497 0

c  -1-1 --> -2
c    ( b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧  b^{11, 36}_0 ∧ -p_396) -> ( b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0)
c  in CNF:
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨  b^{11, 37}_2
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨  b^{11, 37}_1
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨  p_396 ∨ -b^{11, 37}_0
c  in DIMACS:
-11492  11493 -11494  396  11495 0
-11492  11493 -11494  396  11496 0
-11492  11493 -11494  396 -11497 0

c  -2-1 --> break 
c    ( b^{11, 36}_2 ∧  b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨  b^{11, 36}_0 ∨  p_396 ∨ break
c  in DIMACS:
-11492 -11493  11494  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 36}_2 ∧ -b^{11, 36}_1 ∧ -b^{11, 36}_0 ∧ true) 
c  in CNF:
c    -b^{11, 36}_2 ∨  b^{11, 36}_1 ∨  b^{11, 36}_0 ∨ false 
c  in DIMACS:
-11492  11493  11494  0

c  3 does not represent an automaton state.
c    -(-b^{11, 36}_2 ∧  b^{11, 36}_1 ∧  b^{11, 36}_0 ∧ true) 
c  in CNF:
c     b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ false 
c  in DIMACS:
 11492 -11493 -11494  0
c  -3 does not represent an automaton state.
c    -( b^{11, 36}_2 ∧  b^{11, 36}_1 ∧  b^{11, 36}_0 ∧ true) 
c  in CNF:
c    -b^{11, 36}_2 ∨ -b^{11, 36}_1 ∨ -b^{11, 36}_0 ∨ false 
c  in DIMACS:
-11492 -11493 -11494  0

c i = 37
c  -2+1 --> -1
c    ( b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧  p_407) -> ( b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0)
c  in CNF:
c    -b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨  b^{11, 38}_2
c    -b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_1
c    -b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨  b^{11, 38}_0
c  in DIMACS:
-11495 -11496  11497 -407  11498 0
-11495 -11496  11497 -407 -11499 0
-11495 -11496  11497 -407  11500 0

c  -1+1 --> 0
c    ( b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0 ∧  p_407) -> (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧ -b^{11, 38}_0)
c  in CNF:
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_2
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_1
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_0
c  in DIMACS:
-11495  11496 -11497 -407 -11498 0
-11495  11496 -11497 -407 -11499 0
-11495  11496 -11497 -407 -11500 0

c  0+1 --> 1
c    (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧  p_407) -> (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0)
c  in CNF:
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_2
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_1
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨  b^{11, 38}_0
c  in DIMACS:
 11495  11496  11497 -407 -11498 0
 11495  11496  11497 -407 -11499 0
 11495  11496  11497 -407  11500 0

c  1+1 --> 2
c    (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0 ∧  p_407) -> (-b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0)
c  in CNF:
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_2
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨  b^{11, 38}_1
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ -p_407 ∨ -b^{11, 38}_0
c  in DIMACS:
 11495  11496 -11497 -407 -11498 0
 11495  11496 -11497 -407  11499 0
 11495  11496 -11497 -407 -11500 0

c  2+1 --> break 
c    (-b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧  p_407) -> break
c  in CNF:
c     b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ -p_407 ∨ break
c  in DIMACS:
 11495 -11496  11497 -407 1162 0


c  2-1 --> 1
c    (-b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧ -p_407) -> (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0)
c  in CNF:
c     b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_2
c     b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_1
c     b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨  b^{11, 38}_0
c  in DIMACS:
 11495 -11496  11497  407 -11498 0
 11495 -11496  11497  407 -11499 0
 11495 -11496  11497  407  11500 0

c  1-1 --> 0
c    (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0 ∧ -p_407) -> (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧ -b^{11, 38}_0)
c  in CNF:
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_2
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_1
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_0
c  in DIMACS:
 11495  11496 -11497  407 -11498 0
 11495  11496 -11497  407 -11499 0
 11495  11496 -11497  407 -11500 0

c  0-1 --> -1
c    (-b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧ -p_407) -> ( b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0)
c  in CNF:
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨  b^{11, 38}_2
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_1
c     b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨  b^{11, 38}_0
c  in DIMACS:
 11495  11496  11497  407  11498 0
 11495  11496  11497  407 -11499 0
 11495  11496  11497  407  11500 0

c  -1-1 --> -2
c    ( b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧  b^{11, 37}_0 ∧ -p_407) -> ( b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0)
c  in CNF:
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨  b^{11, 38}_2
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨  b^{11, 38}_1
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨  p_407 ∨ -b^{11, 38}_0
c  in DIMACS:
-11495  11496 -11497  407  11498 0
-11495  11496 -11497  407  11499 0
-11495  11496 -11497  407 -11500 0

c  -2-1 --> break 
c    ( b^{11, 37}_2 ∧  b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧ -p_407) -> break
c  in CNF:
c    -b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨  b^{11, 37}_0 ∨  p_407 ∨ break
c  in DIMACS:
-11495 -11496  11497  407 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 37}_2 ∧ -b^{11, 37}_1 ∧ -b^{11, 37}_0 ∧ true) 
c  in CNF:
c    -b^{11, 37}_2 ∨  b^{11, 37}_1 ∨  b^{11, 37}_0 ∨ false 
c  in DIMACS:
-11495  11496  11497  0

c  3 does not represent an automaton state.
c    -(-b^{11, 37}_2 ∧  b^{11, 37}_1 ∧  b^{11, 37}_0 ∧ true) 
c  in CNF:
c     b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ false 
c  in DIMACS:
 11495 -11496 -11497  0
c  -3 does not represent an automaton state.
c    -( b^{11, 37}_2 ∧  b^{11, 37}_1 ∧  b^{11, 37}_0 ∧ true) 
c  in CNF:
c    -b^{11, 37}_2 ∨ -b^{11, 37}_1 ∨ -b^{11, 37}_0 ∨ false 
c  in DIMACS:
-11495 -11496 -11497  0

c i = 38
c  -2+1 --> -1
c    ( b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧  p_418) -> ( b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0)
c  in CNF:
c    -b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨  b^{11, 39}_2
c    -b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_1
c    -b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨  b^{11, 39}_0
c  in DIMACS:
-11498 -11499  11500 -418  11501 0
-11498 -11499  11500 -418 -11502 0
-11498 -11499  11500 -418  11503 0

c  -1+1 --> 0
c    ( b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0 ∧  p_418) -> (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧ -b^{11, 39}_0)
c  in CNF:
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_2
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_1
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_0
c  in DIMACS:
-11498  11499 -11500 -418 -11501 0
-11498  11499 -11500 -418 -11502 0
-11498  11499 -11500 -418 -11503 0

c  0+1 --> 1
c    (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧  p_418) -> (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0)
c  in CNF:
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_2
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_1
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨  b^{11, 39}_0
c  in DIMACS:
 11498  11499  11500 -418 -11501 0
 11498  11499  11500 -418 -11502 0
 11498  11499  11500 -418  11503 0

c  1+1 --> 2
c    (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0 ∧  p_418) -> (-b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0)
c  in CNF:
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_2
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨  b^{11, 39}_1
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ -p_418 ∨ -b^{11, 39}_0
c  in DIMACS:
 11498  11499 -11500 -418 -11501 0
 11498  11499 -11500 -418  11502 0
 11498  11499 -11500 -418 -11503 0

c  2+1 --> break 
c    (-b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧  p_418) -> break
c  in CNF:
c     b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 11498 -11499  11500 -418 1162 0


c  2-1 --> 1
c    (-b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧ -p_418) -> (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0)
c  in CNF:
c     b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_2
c     b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_1
c     b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨  b^{11, 39}_0
c  in DIMACS:
 11498 -11499  11500  418 -11501 0
 11498 -11499  11500  418 -11502 0
 11498 -11499  11500  418  11503 0

c  1-1 --> 0
c    (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0 ∧ -p_418) -> (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧ -b^{11, 39}_0)
c  in CNF:
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_2
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_1
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_0
c  in DIMACS:
 11498  11499 -11500  418 -11501 0
 11498  11499 -11500  418 -11502 0
 11498  11499 -11500  418 -11503 0

c  0-1 --> -1
c    (-b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧ -p_418) -> ( b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0)
c  in CNF:
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨  b^{11, 39}_2
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_1
c     b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨  b^{11, 39}_0
c  in DIMACS:
 11498  11499  11500  418  11501 0
 11498  11499  11500  418 -11502 0
 11498  11499  11500  418  11503 0

c  -1-1 --> -2
c    ( b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧  b^{11, 38}_0 ∧ -p_418) -> ( b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0)
c  in CNF:
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨  b^{11, 39}_2
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨  b^{11, 39}_1
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨  p_418 ∨ -b^{11, 39}_0
c  in DIMACS:
-11498  11499 -11500  418  11501 0
-11498  11499 -11500  418  11502 0
-11498  11499 -11500  418 -11503 0

c  -2-1 --> break 
c    ( b^{11, 38}_2 ∧  b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨  b^{11, 38}_0 ∨  p_418 ∨ break
c  in DIMACS:
-11498 -11499  11500  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 38}_2 ∧ -b^{11, 38}_1 ∧ -b^{11, 38}_0 ∧ true) 
c  in CNF:
c    -b^{11, 38}_2 ∨  b^{11, 38}_1 ∨  b^{11, 38}_0 ∨ false 
c  in DIMACS:
-11498  11499  11500  0

c  3 does not represent an automaton state.
c    -(-b^{11, 38}_2 ∧  b^{11, 38}_1 ∧  b^{11, 38}_0 ∧ true) 
c  in CNF:
c     b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ false 
c  in DIMACS:
 11498 -11499 -11500  0
c  -3 does not represent an automaton state.
c    -( b^{11, 38}_2 ∧  b^{11, 38}_1 ∧  b^{11, 38}_0 ∧ true) 
c  in CNF:
c    -b^{11, 38}_2 ∨ -b^{11, 38}_1 ∨ -b^{11, 38}_0 ∨ false 
c  in DIMACS:
-11498 -11499 -11500  0

c i = 39
c  -2+1 --> -1
c    ( b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧  p_429) -> ( b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0)
c  in CNF:
c    -b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨  b^{11, 40}_2
c    -b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_1
c    -b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨  b^{11, 40}_0
c  in DIMACS:
-11501 -11502  11503 -429  11504 0
-11501 -11502  11503 -429 -11505 0
-11501 -11502  11503 -429  11506 0

c  -1+1 --> 0
c    ( b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0 ∧  p_429) -> (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧ -b^{11, 40}_0)
c  in CNF:
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_2
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_1
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_0
c  in DIMACS:
-11501  11502 -11503 -429 -11504 0
-11501  11502 -11503 -429 -11505 0
-11501  11502 -11503 -429 -11506 0

c  0+1 --> 1
c    (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧  p_429) -> (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0)
c  in CNF:
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_2
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_1
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨  b^{11, 40}_0
c  in DIMACS:
 11501  11502  11503 -429 -11504 0
 11501  11502  11503 -429 -11505 0
 11501  11502  11503 -429  11506 0

c  1+1 --> 2
c    (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0 ∧  p_429) -> (-b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0)
c  in CNF:
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_2
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨  b^{11, 40}_1
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ -p_429 ∨ -b^{11, 40}_0
c  in DIMACS:
 11501  11502 -11503 -429 -11504 0
 11501  11502 -11503 -429  11505 0
 11501  11502 -11503 -429 -11506 0

c  2+1 --> break 
c    (-b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧  p_429) -> break
c  in CNF:
c     b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 11501 -11502  11503 -429 1162 0


c  2-1 --> 1
c    (-b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧ -p_429) -> (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0)
c  in CNF:
c     b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_2
c     b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_1
c     b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨  b^{11, 40}_0
c  in DIMACS:
 11501 -11502  11503  429 -11504 0
 11501 -11502  11503  429 -11505 0
 11501 -11502  11503  429  11506 0

c  1-1 --> 0
c    (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0 ∧ -p_429) -> (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧ -b^{11, 40}_0)
c  in CNF:
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_2
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_1
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_0
c  in DIMACS:
 11501  11502 -11503  429 -11504 0
 11501  11502 -11503  429 -11505 0
 11501  11502 -11503  429 -11506 0

c  0-1 --> -1
c    (-b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧ -p_429) -> ( b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0)
c  in CNF:
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨  b^{11, 40}_2
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_1
c     b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨  b^{11, 40}_0
c  in DIMACS:
 11501  11502  11503  429  11504 0
 11501  11502  11503  429 -11505 0
 11501  11502  11503  429  11506 0

c  -1-1 --> -2
c    ( b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧  b^{11, 39}_0 ∧ -p_429) -> ( b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0)
c  in CNF:
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨  b^{11, 40}_2
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨  b^{11, 40}_1
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨  p_429 ∨ -b^{11, 40}_0
c  in DIMACS:
-11501  11502 -11503  429  11504 0
-11501  11502 -11503  429  11505 0
-11501  11502 -11503  429 -11506 0

c  -2-1 --> break 
c    ( b^{11, 39}_2 ∧  b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨  b^{11, 39}_0 ∨  p_429 ∨ break
c  in DIMACS:
-11501 -11502  11503  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 39}_2 ∧ -b^{11, 39}_1 ∧ -b^{11, 39}_0 ∧ true) 
c  in CNF:
c    -b^{11, 39}_2 ∨  b^{11, 39}_1 ∨  b^{11, 39}_0 ∨ false 
c  in DIMACS:
-11501  11502  11503  0

c  3 does not represent an automaton state.
c    -(-b^{11, 39}_2 ∧  b^{11, 39}_1 ∧  b^{11, 39}_0 ∧ true) 
c  in CNF:
c     b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ false 
c  in DIMACS:
 11501 -11502 -11503  0
c  -3 does not represent an automaton state.
c    -( b^{11, 39}_2 ∧  b^{11, 39}_1 ∧  b^{11, 39}_0 ∧ true) 
c  in CNF:
c    -b^{11, 39}_2 ∨ -b^{11, 39}_1 ∨ -b^{11, 39}_0 ∨ false 
c  in DIMACS:
-11501 -11502 -11503  0

c i = 40
c  -2+1 --> -1
c    ( b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧  p_440) -> ( b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0)
c  in CNF:
c    -b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨  b^{11, 41}_2
c    -b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_1
c    -b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨  b^{11, 41}_0
c  in DIMACS:
-11504 -11505  11506 -440  11507 0
-11504 -11505  11506 -440 -11508 0
-11504 -11505  11506 -440  11509 0

c  -1+1 --> 0
c    ( b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0 ∧  p_440) -> (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧ -b^{11, 41}_0)
c  in CNF:
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_2
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_1
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_0
c  in DIMACS:
-11504  11505 -11506 -440 -11507 0
-11504  11505 -11506 -440 -11508 0
-11504  11505 -11506 -440 -11509 0

c  0+1 --> 1
c    (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧  p_440) -> (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0)
c  in CNF:
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_2
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_1
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨  b^{11, 41}_0
c  in DIMACS:
 11504  11505  11506 -440 -11507 0
 11504  11505  11506 -440 -11508 0
 11504  11505  11506 -440  11509 0

c  1+1 --> 2
c    (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0 ∧  p_440) -> (-b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0)
c  in CNF:
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_2
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨  b^{11, 41}_1
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ -p_440 ∨ -b^{11, 41}_0
c  in DIMACS:
 11504  11505 -11506 -440 -11507 0
 11504  11505 -11506 -440  11508 0
 11504  11505 -11506 -440 -11509 0

c  2+1 --> break 
c    (-b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧  p_440) -> break
c  in CNF:
c     b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 11504 -11505  11506 -440 1162 0


c  2-1 --> 1
c    (-b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧ -p_440) -> (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0)
c  in CNF:
c     b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_2
c     b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_1
c     b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨  b^{11, 41}_0
c  in DIMACS:
 11504 -11505  11506  440 -11507 0
 11504 -11505  11506  440 -11508 0
 11504 -11505  11506  440  11509 0

c  1-1 --> 0
c    (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0 ∧ -p_440) -> (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧ -b^{11, 41}_0)
c  in CNF:
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_2
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_1
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_0
c  in DIMACS:
 11504  11505 -11506  440 -11507 0
 11504  11505 -11506  440 -11508 0
 11504  11505 -11506  440 -11509 0

c  0-1 --> -1
c    (-b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧ -p_440) -> ( b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0)
c  in CNF:
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨  b^{11, 41}_2
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_1
c     b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨  b^{11, 41}_0
c  in DIMACS:
 11504  11505  11506  440  11507 0
 11504  11505  11506  440 -11508 0
 11504  11505  11506  440  11509 0

c  -1-1 --> -2
c    ( b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧  b^{11, 40}_0 ∧ -p_440) -> ( b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0)
c  in CNF:
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨  b^{11, 41}_2
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨  b^{11, 41}_1
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨  p_440 ∨ -b^{11, 41}_0
c  in DIMACS:
-11504  11505 -11506  440  11507 0
-11504  11505 -11506  440  11508 0
-11504  11505 -11506  440 -11509 0

c  -2-1 --> break 
c    ( b^{11, 40}_2 ∧  b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨  b^{11, 40}_0 ∨  p_440 ∨ break
c  in DIMACS:
-11504 -11505  11506  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 40}_2 ∧ -b^{11, 40}_1 ∧ -b^{11, 40}_0 ∧ true) 
c  in CNF:
c    -b^{11, 40}_2 ∨  b^{11, 40}_1 ∨  b^{11, 40}_0 ∨ false 
c  in DIMACS:
-11504  11505  11506  0

c  3 does not represent an automaton state.
c    -(-b^{11, 40}_2 ∧  b^{11, 40}_1 ∧  b^{11, 40}_0 ∧ true) 
c  in CNF:
c     b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ false 
c  in DIMACS:
 11504 -11505 -11506  0
c  -3 does not represent an automaton state.
c    -( b^{11, 40}_2 ∧  b^{11, 40}_1 ∧  b^{11, 40}_0 ∧ true) 
c  in CNF:
c    -b^{11, 40}_2 ∨ -b^{11, 40}_1 ∨ -b^{11, 40}_0 ∨ false 
c  in DIMACS:
-11504 -11505 -11506  0

c i = 41
c  -2+1 --> -1
c    ( b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧  p_451) -> ( b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0)
c  in CNF:
c    -b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨  b^{11, 42}_2
c    -b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_1
c    -b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨  b^{11, 42}_0
c  in DIMACS:
-11507 -11508  11509 -451  11510 0
-11507 -11508  11509 -451 -11511 0
-11507 -11508  11509 -451  11512 0

c  -1+1 --> 0
c    ( b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0 ∧  p_451) -> (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧ -b^{11, 42}_0)
c  in CNF:
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_2
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_1
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_0
c  in DIMACS:
-11507  11508 -11509 -451 -11510 0
-11507  11508 -11509 -451 -11511 0
-11507  11508 -11509 -451 -11512 0

c  0+1 --> 1
c    (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧  p_451) -> (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0)
c  in CNF:
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_2
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_1
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨  b^{11, 42}_0
c  in DIMACS:
 11507  11508  11509 -451 -11510 0
 11507  11508  11509 -451 -11511 0
 11507  11508  11509 -451  11512 0

c  1+1 --> 2
c    (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0 ∧  p_451) -> (-b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0)
c  in CNF:
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_2
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨  b^{11, 42}_1
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ -p_451 ∨ -b^{11, 42}_0
c  in DIMACS:
 11507  11508 -11509 -451 -11510 0
 11507  11508 -11509 -451  11511 0
 11507  11508 -11509 -451 -11512 0

c  2+1 --> break 
c    (-b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧  p_451) -> break
c  in CNF:
c     b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ -p_451 ∨ break
c  in DIMACS:
 11507 -11508  11509 -451 1162 0


c  2-1 --> 1
c    (-b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧ -p_451) -> (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0)
c  in CNF:
c     b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_2
c     b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_1
c     b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨  b^{11, 42}_0
c  in DIMACS:
 11507 -11508  11509  451 -11510 0
 11507 -11508  11509  451 -11511 0
 11507 -11508  11509  451  11512 0

c  1-1 --> 0
c    (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0 ∧ -p_451) -> (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧ -b^{11, 42}_0)
c  in CNF:
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_2
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_1
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_0
c  in DIMACS:
 11507  11508 -11509  451 -11510 0
 11507  11508 -11509  451 -11511 0
 11507  11508 -11509  451 -11512 0

c  0-1 --> -1
c    (-b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧ -p_451) -> ( b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0)
c  in CNF:
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨  b^{11, 42}_2
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_1
c     b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨  b^{11, 42}_0
c  in DIMACS:
 11507  11508  11509  451  11510 0
 11507  11508  11509  451 -11511 0
 11507  11508  11509  451  11512 0

c  -1-1 --> -2
c    ( b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧  b^{11, 41}_0 ∧ -p_451) -> ( b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0)
c  in CNF:
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨  b^{11, 42}_2
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨  b^{11, 42}_1
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨  p_451 ∨ -b^{11, 42}_0
c  in DIMACS:
-11507  11508 -11509  451  11510 0
-11507  11508 -11509  451  11511 0
-11507  11508 -11509  451 -11512 0

c  -2-1 --> break 
c    ( b^{11, 41}_2 ∧  b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧ -p_451) -> break
c  in CNF:
c    -b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨  b^{11, 41}_0 ∨  p_451 ∨ break
c  in DIMACS:
-11507 -11508  11509  451 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 41}_2 ∧ -b^{11, 41}_1 ∧ -b^{11, 41}_0 ∧ true) 
c  in CNF:
c    -b^{11, 41}_2 ∨  b^{11, 41}_1 ∨  b^{11, 41}_0 ∨ false 
c  in DIMACS:
-11507  11508  11509  0

c  3 does not represent an automaton state.
c    -(-b^{11, 41}_2 ∧  b^{11, 41}_1 ∧  b^{11, 41}_0 ∧ true) 
c  in CNF:
c     b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ false 
c  in DIMACS:
 11507 -11508 -11509  0
c  -3 does not represent an automaton state.
c    -( b^{11, 41}_2 ∧  b^{11, 41}_1 ∧  b^{11, 41}_0 ∧ true) 
c  in CNF:
c    -b^{11, 41}_2 ∨ -b^{11, 41}_1 ∨ -b^{11, 41}_0 ∨ false 
c  in DIMACS:
-11507 -11508 -11509  0

c i = 42
c  -2+1 --> -1
c    ( b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧  p_462) -> ( b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0)
c  in CNF:
c    -b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨  b^{11, 43}_2
c    -b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_1
c    -b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨  b^{11, 43}_0
c  in DIMACS:
-11510 -11511  11512 -462  11513 0
-11510 -11511  11512 -462 -11514 0
-11510 -11511  11512 -462  11515 0

c  -1+1 --> 0
c    ( b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0 ∧  p_462) -> (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧ -b^{11, 43}_0)
c  in CNF:
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_2
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_1
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_0
c  in DIMACS:
-11510  11511 -11512 -462 -11513 0
-11510  11511 -11512 -462 -11514 0
-11510  11511 -11512 -462 -11515 0

c  0+1 --> 1
c    (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧  p_462) -> (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0)
c  in CNF:
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_2
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_1
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨  b^{11, 43}_0
c  in DIMACS:
 11510  11511  11512 -462 -11513 0
 11510  11511  11512 -462 -11514 0
 11510  11511  11512 -462  11515 0

c  1+1 --> 2
c    (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0 ∧  p_462) -> (-b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0)
c  in CNF:
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_2
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨  b^{11, 43}_1
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ -p_462 ∨ -b^{11, 43}_0
c  in DIMACS:
 11510  11511 -11512 -462 -11513 0
 11510  11511 -11512 -462  11514 0
 11510  11511 -11512 -462 -11515 0

c  2+1 --> break 
c    (-b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧  p_462) -> break
c  in CNF:
c     b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 11510 -11511  11512 -462 1162 0


c  2-1 --> 1
c    (-b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧ -p_462) -> (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0)
c  in CNF:
c     b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_2
c     b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_1
c     b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨  b^{11, 43}_0
c  in DIMACS:
 11510 -11511  11512  462 -11513 0
 11510 -11511  11512  462 -11514 0
 11510 -11511  11512  462  11515 0

c  1-1 --> 0
c    (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0 ∧ -p_462) -> (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧ -b^{11, 43}_0)
c  in CNF:
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_2
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_1
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_0
c  in DIMACS:
 11510  11511 -11512  462 -11513 0
 11510  11511 -11512  462 -11514 0
 11510  11511 -11512  462 -11515 0

c  0-1 --> -1
c    (-b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧ -p_462) -> ( b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0)
c  in CNF:
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨  b^{11, 43}_2
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_1
c     b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨  b^{11, 43}_0
c  in DIMACS:
 11510  11511  11512  462  11513 0
 11510  11511  11512  462 -11514 0
 11510  11511  11512  462  11515 0

c  -1-1 --> -2
c    ( b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧  b^{11, 42}_0 ∧ -p_462) -> ( b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0)
c  in CNF:
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨  b^{11, 43}_2
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨  b^{11, 43}_1
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨  p_462 ∨ -b^{11, 43}_0
c  in DIMACS:
-11510  11511 -11512  462  11513 0
-11510  11511 -11512  462  11514 0
-11510  11511 -11512  462 -11515 0

c  -2-1 --> break 
c    ( b^{11, 42}_2 ∧  b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨  b^{11, 42}_0 ∨  p_462 ∨ break
c  in DIMACS:
-11510 -11511  11512  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 42}_2 ∧ -b^{11, 42}_1 ∧ -b^{11, 42}_0 ∧ true) 
c  in CNF:
c    -b^{11, 42}_2 ∨  b^{11, 42}_1 ∨  b^{11, 42}_0 ∨ false 
c  in DIMACS:
-11510  11511  11512  0

c  3 does not represent an automaton state.
c    -(-b^{11, 42}_2 ∧  b^{11, 42}_1 ∧  b^{11, 42}_0 ∧ true) 
c  in CNF:
c     b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ false 
c  in DIMACS:
 11510 -11511 -11512  0
c  -3 does not represent an automaton state.
c    -( b^{11, 42}_2 ∧  b^{11, 42}_1 ∧  b^{11, 42}_0 ∧ true) 
c  in CNF:
c    -b^{11, 42}_2 ∨ -b^{11, 42}_1 ∨ -b^{11, 42}_0 ∨ false 
c  in DIMACS:
-11510 -11511 -11512  0

c i = 43
c  -2+1 --> -1
c    ( b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧  p_473) -> ( b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0)
c  in CNF:
c    -b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨  b^{11, 44}_2
c    -b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_1
c    -b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨  b^{11, 44}_0
c  in DIMACS:
-11513 -11514  11515 -473  11516 0
-11513 -11514  11515 -473 -11517 0
-11513 -11514  11515 -473  11518 0

c  -1+1 --> 0
c    ( b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0 ∧  p_473) -> (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧ -b^{11, 44}_0)
c  in CNF:
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_2
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_1
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_0
c  in DIMACS:
-11513  11514 -11515 -473 -11516 0
-11513  11514 -11515 -473 -11517 0
-11513  11514 -11515 -473 -11518 0

c  0+1 --> 1
c    (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧  p_473) -> (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0)
c  in CNF:
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_2
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_1
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨  b^{11, 44}_0
c  in DIMACS:
 11513  11514  11515 -473 -11516 0
 11513  11514  11515 -473 -11517 0
 11513  11514  11515 -473  11518 0

c  1+1 --> 2
c    (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0 ∧  p_473) -> (-b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0)
c  in CNF:
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_2
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨  b^{11, 44}_1
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ -p_473 ∨ -b^{11, 44}_0
c  in DIMACS:
 11513  11514 -11515 -473 -11516 0
 11513  11514 -11515 -473  11517 0
 11513  11514 -11515 -473 -11518 0

c  2+1 --> break 
c    (-b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧  p_473) -> break
c  in CNF:
c     b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ -p_473 ∨ break
c  in DIMACS:
 11513 -11514  11515 -473 1162 0


c  2-1 --> 1
c    (-b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧ -p_473) -> (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0)
c  in CNF:
c     b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_2
c     b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_1
c     b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨  b^{11, 44}_0
c  in DIMACS:
 11513 -11514  11515  473 -11516 0
 11513 -11514  11515  473 -11517 0
 11513 -11514  11515  473  11518 0

c  1-1 --> 0
c    (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0 ∧ -p_473) -> (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧ -b^{11, 44}_0)
c  in CNF:
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_2
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_1
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_0
c  in DIMACS:
 11513  11514 -11515  473 -11516 0
 11513  11514 -11515  473 -11517 0
 11513  11514 -11515  473 -11518 0

c  0-1 --> -1
c    (-b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧ -p_473) -> ( b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0)
c  in CNF:
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨  b^{11, 44}_2
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_1
c     b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨  b^{11, 44}_0
c  in DIMACS:
 11513  11514  11515  473  11516 0
 11513  11514  11515  473 -11517 0
 11513  11514  11515  473  11518 0

c  -1-1 --> -2
c    ( b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧  b^{11, 43}_0 ∧ -p_473) -> ( b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0)
c  in CNF:
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨  b^{11, 44}_2
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨  b^{11, 44}_1
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨  p_473 ∨ -b^{11, 44}_0
c  in DIMACS:
-11513  11514 -11515  473  11516 0
-11513  11514 -11515  473  11517 0
-11513  11514 -11515  473 -11518 0

c  -2-1 --> break 
c    ( b^{11, 43}_2 ∧  b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧ -p_473) -> break
c  in CNF:
c    -b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨  b^{11, 43}_0 ∨  p_473 ∨ break
c  in DIMACS:
-11513 -11514  11515  473 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 43}_2 ∧ -b^{11, 43}_1 ∧ -b^{11, 43}_0 ∧ true) 
c  in CNF:
c    -b^{11, 43}_2 ∨  b^{11, 43}_1 ∨  b^{11, 43}_0 ∨ false 
c  in DIMACS:
-11513  11514  11515  0

c  3 does not represent an automaton state.
c    -(-b^{11, 43}_2 ∧  b^{11, 43}_1 ∧  b^{11, 43}_0 ∧ true) 
c  in CNF:
c     b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ false 
c  in DIMACS:
 11513 -11514 -11515  0
c  -3 does not represent an automaton state.
c    -( b^{11, 43}_2 ∧  b^{11, 43}_1 ∧  b^{11, 43}_0 ∧ true) 
c  in CNF:
c    -b^{11, 43}_2 ∨ -b^{11, 43}_1 ∨ -b^{11, 43}_0 ∨ false 
c  in DIMACS:
-11513 -11514 -11515  0

c i = 44
c  -2+1 --> -1
c    ( b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧  p_484) -> ( b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0)
c  in CNF:
c    -b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨  b^{11, 45}_2
c    -b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_1
c    -b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨  b^{11, 45}_0
c  in DIMACS:
-11516 -11517  11518 -484  11519 0
-11516 -11517  11518 -484 -11520 0
-11516 -11517  11518 -484  11521 0

c  -1+1 --> 0
c    ( b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0 ∧  p_484) -> (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧ -b^{11, 45}_0)
c  in CNF:
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_2
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_1
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_0
c  in DIMACS:
-11516  11517 -11518 -484 -11519 0
-11516  11517 -11518 -484 -11520 0
-11516  11517 -11518 -484 -11521 0

c  0+1 --> 1
c    (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧  p_484) -> (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0)
c  in CNF:
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_2
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_1
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨  b^{11, 45}_0
c  in DIMACS:
 11516  11517  11518 -484 -11519 0
 11516  11517  11518 -484 -11520 0
 11516  11517  11518 -484  11521 0

c  1+1 --> 2
c    (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0 ∧  p_484) -> (-b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0)
c  in CNF:
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_2
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨  b^{11, 45}_1
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ -p_484 ∨ -b^{11, 45}_0
c  in DIMACS:
 11516  11517 -11518 -484 -11519 0
 11516  11517 -11518 -484  11520 0
 11516  11517 -11518 -484 -11521 0

c  2+1 --> break 
c    (-b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧  p_484) -> break
c  in CNF:
c     b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 11516 -11517  11518 -484 1162 0


c  2-1 --> 1
c    (-b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧ -p_484) -> (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0)
c  in CNF:
c     b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_2
c     b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_1
c     b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨  b^{11, 45}_0
c  in DIMACS:
 11516 -11517  11518  484 -11519 0
 11516 -11517  11518  484 -11520 0
 11516 -11517  11518  484  11521 0

c  1-1 --> 0
c    (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0 ∧ -p_484) -> (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧ -b^{11, 45}_0)
c  in CNF:
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_2
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_1
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_0
c  in DIMACS:
 11516  11517 -11518  484 -11519 0
 11516  11517 -11518  484 -11520 0
 11516  11517 -11518  484 -11521 0

c  0-1 --> -1
c    (-b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧ -p_484) -> ( b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0)
c  in CNF:
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨  b^{11, 45}_2
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_1
c     b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨  b^{11, 45}_0
c  in DIMACS:
 11516  11517  11518  484  11519 0
 11516  11517  11518  484 -11520 0
 11516  11517  11518  484  11521 0

c  -1-1 --> -2
c    ( b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧  b^{11, 44}_0 ∧ -p_484) -> ( b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0)
c  in CNF:
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨  b^{11, 45}_2
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨  b^{11, 45}_1
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨  p_484 ∨ -b^{11, 45}_0
c  in DIMACS:
-11516  11517 -11518  484  11519 0
-11516  11517 -11518  484  11520 0
-11516  11517 -11518  484 -11521 0

c  -2-1 --> break 
c    ( b^{11, 44}_2 ∧  b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨  b^{11, 44}_0 ∨  p_484 ∨ break
c  in DIMACS:
-11516 -11517  11518  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 44}_2 ∧ -b^{11, 44}_1 ∧ -b^{11, 44}_0 ∧ true) 
c  in CNF:
c    -b^{11, 44}_2 ∨  b^{11, 44}_1 ∨  b^{11, 44}_0 ∨ false 
c  in DIMACS:
-11516  11517  11518  0

c  3 does not represent an automaton state.
c    -(-b^{11, 44}_2 ∧  b^{11, 44}_1 ∧  b^{11, 44}_0 ∧ true) 
c  in CNF:
c     b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ false 
c  in DIMACS:
 11516 -11517 -11518  0
c  -3 does not represent an automaton state.
c    -( b^{11, 44}_2 ∧  b^{11, 44}_1 ∧  b^{11, 44}_0 ∧ true) 
c  in CNF:
c    -b^{11, 44}_2 ∨ -b^{11, 44}_1 ∨ -b^{11, 44}_0 ∨ false 
c  in DIMACS:
-11516 -11517 -11518  0

c i = 45
c  -2+1 --> -1
c    ( b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧  p_495) -> ( b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0)
c  in CNF:
c    -b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨  b^{11, 46}_2
c    -b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_1
c    -b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨  b^{11, 46}_0
c  in DIMACS:
-11519 -11520  11521 -495  11522 0
-11519 -11520  11521 -495 -11523 0
-11519 -11520  11521 -495  11524 0

c  -1+1 --> 0
c    ( b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0 ∧  p_495) -> (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧ -b^{11, 46}_0)
c  in CNF:
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_2
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_1
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_0
c  in DIMACS:
-11519  11520 -11521 -495 -11522 0
-11519  11520 -11521 -495 -11523 0
-11519  11520 -11521 -495 -11524 0

c  0+1 --> 1
c    (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧  p_495) -> (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0)
c  in CNF:
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_2
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_1
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨  b^{11, 46}_0
c  in DIMACS:
 11519  11520  11521 -495 -11522 0
 11519  11520  11521 -495 -11523 0
 11519  11520  11521 -495  11524 0

c  1+1 --> 2
c    (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0 ∧  p_495) -> (-b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0)
c  in CNF:
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_2
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨  b^{11, 46}_1
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ -p_495 ∨ -b^{11, 46}_0
c  in DIMACS:
 11519  11520 -11521 -495 -11522 0
 11519  11520 -11521 -495  11523 0
 11519  11520 -11521 -495 -11524 0

c  2+1 --> break 
c    (-b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧  p_495) -> break
c  in CNF:
c     b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 11519 -11520  11521 -495 1162 0


c  2-1 --> 1
c    (-b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧ -p_495) -> (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0)
c  in CNF:
c     b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_2
c     b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_1
c     b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨  b^{11, 46}_0
c  in DIMACS:
 11519 -11520  11521  495 -11522 0
 11519 -11520  11521  495 -11523 0
 11519 -11520  11521  495  11524 0

c  1-1 --> 0
c    (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0 ∧ -p_495) -> (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧ -b^{11, 46}_0)
c  in CNF:
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_2
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_1
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_0
c  in DIMACS:
 11519  11520 -11521  495 -11522 0
 11519  11520 -11521  495 -11523 0
 11519  11520 -11521  495 -11524 0

c  0-1 --> -1
c    (-b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧ -p_495) -> ( b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0)
c  in CNF:
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨  b^{11, 46}_2
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_1
c     b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨  b^{11, 46}_0
c  in DIMACS:
 11519  11520  11521  495  11522 0
 11519  11520  11521  495 -11523 0
 11519  11520  11521  495  11524 0

c  -1-1 --> -2
c    ( b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧  b^{11, 45}_0 ∧ -p_495) -> ( b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0)
c  in CNF:
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨  b^{11, 46}_2
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨  b^{11, 46}_1
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨  p_495 ∨ -b^{11, 46}_0
c  in DIMACS:
-11519  11520 -11521  495  11522 0
-11519  11520 -11521  495  11523 0
-11519  11520 -11521  495 -11524 0

c  -2-1 --> break 
c    ( b^{11, 45}_2 ∧  b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨  b^{11, 45}_0 ∨  p_495 ∨ break
c  in DIMACS:
-11519 -11520  11521  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 45}_2 ∧ -b^{11, 45}_1 ∧ -b^{11, 45}_0 ∧ true) 
c  in CNF:
c    -b^{11, 45}_2 ∨  b^{11, 45}_1 ∨  b^{11, 45}_0 ∨ false 
c  in DIMACS:
-11519  11520  11521  0

c  3 does not represent an automaton state.
c    -(-b^{11, 45}_2 ∧  b^{11, 45}_1 ∧  b^{11, 45}_0 ∧ true) 
c  in CNF:
c     b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ false 
c  in DIMACS:
 11519 -11520 -11521  0
c  -3 does not represent an automaton state.
c    -( b^{11, 45}_2 ∧  b^{11, 45}_1 ∧  b^{11, 45}_0 ∧ true) 
c  in CNF:
c    -b^{11, 45}_2 ∨ -b^{11, 45}_1 ∨ -b^{11, 45}_0 ∨ false 
c  in DIMACS:
-11519 -11520 -11521  0

c i = 46
c  -2+1 --> -1
c    ( b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧  p_506) -> ( b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0)
c  in CNF:
c    -b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨  b^{11, 47}_2
c    -b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_1
c    -b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨  b^{11, 47}_0
c  in DIMACS:
-11522 -11523  11524 -506  11525 0
-11522 -11523  11524 -506 -11526 0
-11522 -11523  11524 -506  11527 0

c  -1+1 --> 0
c    ( b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0 ∧  p_506) -> (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧ -b^{11, 47}_0)
c  in CNF:
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_2
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_1
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_0
c  in DIMACS:
-11522  11523 -11524 -506 -11525 0
-11522  11523 -11524 -506 -11526 0
-11522  11523 -11524 -506 -11527 0

c  0+1 --> 1
c    (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧  p_506) -> (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0)
c  in CNF:
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_2
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_1
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨  b^{11, 47}_0
c  in DIMACS:
 11522  11523  11524 -506 -11525 0
 11522  11523  11524 -506 -11526 0
 11522  11523  11524 -506  11527 0

c  1+1 --> 2
c    (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0 ∧  p_506) -> (-b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0)
c  in CNF:
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_2
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨  b^{11, 47}_1
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ -p_506 ∨ -b^{11, 47}_0
c  in DIMACS:
 11522  11523 -11524 -506 -11525 0
 11522  11523 -11524 -506  11526 0
 11522  11523 -11524 -506 -11527 0

c  2+1 --> break 
c    (-b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧  p_506) -> break
c  in CNF:
c     b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 11522 -11523  11524 -506 1162 0


c  2-1 --> 1
c    (-b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧ -p_506) -> (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0)
c  in CNF:
c     b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_2
c     b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_1
c     b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨  b^{11, 47}_0
c  in DIMACS:
 11522 -11523  11524  506 -11525 0
 11522 -11523  11524  506 -11526 0
 11522 -11523  11524  506  11527 0

c  1-1 --> 0
c    (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0 ∧ -p_506) -> (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧ -b^{11, 47}_0)
c  in CNF:
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_2
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_1
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_0
c  in DIMACS:
 11522  11523 -11524  506 -11525 0
 11522  11523 -11524  506 -11526 0
 11522  11523 -11524  506 -11527 0

c  0-1 --> -1
c    (-b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧ -p_506) -> ( b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0)
c  in CNF:
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨  b^{11, 47}_2
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_1
c     b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨  b^{11, 47}_0
c  in DIMACS:
 11522  11523  11524  506  11525 0
 11522  11523  11524  506 -11526 0
 11522  11523  11524  506  11527 0

c  -1-1 --> -2
c    ( b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧  b^{11, 46}_0 ∧ -p_506) -> ( b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0)
c  in CNF:
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨  b^{11, 47}_2
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨  b^{11, 47}_1
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨  p_506 ∨ -b^{11, 47}_0
c  in DIMACS:
-11522  11523 -11524  506  11525 0
-11522  11523 -11524  506  11526 0
-11522  11523 -11524  506 -11527 0

c  -2-1 --> break 
c    ( b^{11, 46}_2 ∧  b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨  b^{11, 46}_0 ∨  p_506 ∨ break
c  in DIMACS:
-11522 -11523  11524  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 46}_2 ∧ -b^{11, 46}_1 ∧ -b^{11, 46}_0 ∧ true) 
c  in CNF:
c    -b^{11, 46}_2 ∨  b^{11, 46}_1 ∨  b^{11, 46}_0 ∨ false 
c  in DIMACS:
-11522  11523  11524  0

c  3 does not represent an automaton state.
c    -(-b^{11, 46}_2 ∧  b^{11, 46}_1 ∧  b^{11, 46}_0 ∧ true) 
c  in CNF:
c     b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ false 
c  in DIMACS:
 11522 -11523 -11524  0
c  -3 does not represent an automaton state.
c    -( b^{11, 46}_2 ∧  b^{11, 46}_1 ∧  b^{11, 46}_0 ∧ true) 
c  in CNF:
c    -b^{11, 46}_2 ∨ -b^{11, 46}_1 ∨ -b^{11, 46}_0 ∨ false 
c  in DIMACS:
-11522 -11523 -11524  0

c i = 47
c  -2+1 --> -1
c    ( b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧  p_517) -> ( b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0)
c  in CNF:
c    -b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨  b^{11, 48}_2
c    -b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_1
c    -b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨  b^{11, 48}_0
c  in DIMACS:
-11525 -11526  11527 -517  11528 0
-11525 -11526  11527 -517 -11529 0
-11525 -11526  11527 -517  11530 0

c  -1+1 --> 0
c    ( b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0 ∧  p_517) -> (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧ -b^{11, 48}_0)
c  in CNF:
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_2
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_1
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_0
c  in DIMACS:
-11525  11526 -11527 -517 -11528 0
-11525  11526 -11527 -517 -11529 0
-11525  11526 -11527 -517 -11530 0

c  0+1 --> 1
c    (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧  p_517) -> (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0)
c  in CNF:
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_2
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_1
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨  b^{11, 48}_0
c  in DIMACS:
 11525  11526  11527 -517 -11528 0
 11525  11526  11527 -517 -11529 0
 11525  11526  11527 -517  11530 0

c  1+1 --> 2
c    (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0 ∧  p_517) -> (-b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0)
c  in CNF:
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_2
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨  b^{11, 48}_1
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ -p_517 ∨ -b^{11, 48}_0
c  in DIMACS:
 11525  11526 -11527 -517 -11528 0
 11525  11526 -11527 -517  11529 0
 11525  11526 -11527 -517 -11530 0

c  2+1 --> break 
c    (-b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧  p_517) -> break
c  in CNF:
c     b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ -p_517 ∨ break
c  in DIMACS:
 11525 -11526  11527 -517 1162 0


c  2-1 --> 1
c    (-b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧ -p_517) -> (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0)
c  in CNF:
c     b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_2
c     b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_1
c     b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨  b^{11, 48}_0
c  in DIMACS:
 11525 -11526  11527  517 -11528 0
 11525 -11526  11527  517 -11529 0
 11525 -11526  11527  517  11530 0

c  1-1 --> 0
c    (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0 ∧ -p_517) -> (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧ -b^{11, 48}_0)
c  in CNF:
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_2
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_1
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_0
c  in DIMACS:
 11525  11526 -11527  517 -11528 0
 11525  11526 -11527  517 -11529 0
 11525  11526 -11527  517 -11530 0

c  0-1 --> -1
c    (-b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧ -p_517) -> ( b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0)
c  in CNF:
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨  b^{11, 48}_2
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_1
c     b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨  b^{11, 48}_0
c  in DIMACS:
 11525  11526  11527  517  11528 0
 11525  11526  11527  517 -11529 0
 11525  11526  11527  517  11530 0

c  -1-1 --> -2
c    ( b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧  b^{11, 47}_0 ∧ -p_517) -> ( b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0)
c  in CNF:
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨  b^{11, 48}_2
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨  b^{11, 48}_1
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨  p_517 ∨ -b^{11, 48}_0
c  in DIMACS:
-11525  11526 -11527  517  11528 0
-11525  11526 -11527  517  11529 0
-11525  11526 -11527  517 -11530 0

c  -2-1 --> break 
c    ( b^{11, 47}_2 ∧  b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧ -p_517) -> break
c  in CNF:
c    -b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨  b^{11, 47}_0 ∨  p_517 ∨ break
c  in DIMACS:
-11525 -11526  11527  517 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 47}_2 ∧ -b^{11, 47}_1 ∧ -b^{11, 47}_0 ∧ true) 
c  in CNF:
c    -b^{11, 47}_2 ∨  b^{11, 47}_1 ∨  b^{11, 47}_0 ∨ false 
c  in DIMACS:
-11525  11526  11527  0

c  3 does not represent an automaton state.
c    -(-b^{11, 47}_2 ∧  b^{11, 47}_1 ∧  b^{11, 47}_0 ∧ true) 
c  in CNF:
c     b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ false 
c  in DIMACS:
 11525 -11526 -11527  0
c  -3 does not represent an automaton state.
c    -( b^{11, 47}_2 ∧  b^{11, 47}_1 ∧  b^{11, 47}_0 ∧ true) 
c  in CNF:
c    -b^{11, 47}_2 ∨ -b^{11, 47}_1 ∨ -b^{11, 47}_0 ∨ false 
c  in DIMACS:
-11525 -11526 -11527  0

c i = 48
c  -2+1 --> -1
c    ( b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧  p_528) -> ( b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0)
c  in CNF:
c    -b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨  b^{11, 49}_2
c    -b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_1
c    -b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨  b^{11, 49}_0
c  in DIMACS:
-11528 -11529  11530 -528  11531 0
-11528 -11529  11530 -528 -11532 0
-11528 -11529  11530 -528  11533 0

c  -1+1 --> 0
c    ( b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0 ∧  p_528) -> (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧ -b^{11, 49}_0)
c  in CNF:
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_2
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_1
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_0
c  in DIMACS:
-11528  11529 -11530 -528 -11531 0
-11528  11529 -11530 -528 -11532 0
-11528  11529 -11530 -528 -11533 0

c  0+1 --> 1
c    (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧  p_528) -> (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0)
c  in CNF:
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_2
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_1
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨  b^{11, 49}_0
c  in DIMACS:
 11528  11529  11530 -528 -11531 0
 11528  11529  11530 -528 -11532 0
 11528  11529  11530 -528  11533 0

c  1+1 --> 2
c    (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0 ∧  p_528) -> (-b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0)
c  in CNF:
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_2
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨  b^{11, 49}_1
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ -p_528 ∨ -b^{11, 49}_0
c  in DIMACS:
 11528  11529 -11530 -528 -11531 0
 11528  11529 -11530 -528  11532 0
 11528  11529 -11530 -528 -11533 0

c  2+1 --> break 
c    (-b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧  p_528) -> break
c  in CNF:
c     b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 11528 -11529  11530 -528 1162 0


c  2-1 --> 1
c    (-b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧ -p_528) -> (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0)
c  in CNF:
c     b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_2
c     b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_1
c     b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨  b^{11, 49}_0
c  in DIMACS:
 11528 -11529  11530  528 -11531 0
 11528 -11529  11530  528 -11532 0
 11528 -11529  11530  528  11533 0

c  1-1 --> 0
c    (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0 ∧ -p_528) -> (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧ -b^{11, 49}_0)
c  in CNF:
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_2
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_1
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_0
c  in DIMACS:
 11528  11529 -11530  528 -11531 0
 11528  11529 -11530  528 -11532 0
 11528  11529 -11530  528 -11533 0

c  0-1 --> -1
c    (-b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧ -p_528) -> ( b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0)
c  in CNF:
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨  b^{11, 49}_2
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_1
c     b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨  b^{11, 49}_0
c  in DIMACS:
 11528  11529  11530  528  11531 0
 11528  11529  11530  528 -11532 0
 11528  11529  11530  528  11533 0

c  -1-1 --> -2
c    ( b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧  b^{11, 48}_0 ∧ -p_528) -> ( b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0)
c  in CNF:
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨  b^{11, 49}_2
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨  b^{11, 49}_1
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨  p_528 ∨ -b^{11, 49}_0
c  in DIMACS:
-11528  11529 -11530  528  11531 0
-11528  11529 -11530  528  11532 0
-11528  11529 -11530  528 -11533 0

c  -2-1 --> break 
c    ( b^{11, 48}_2 ∧  b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨  b^{11, 48}_0 ∨  p_528 ∨ break
c  in DIMACS:
-11528 -11529  11530  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 48}_2 ∧ -b^{11, 48}_1 ∧ -b^{11, 48}_0 ∧ true) 
c  in CNF:
c    -b^{11, 48}_2 ∨  b^{11, 48}_1 ∨  b^{11, 48}_0 ∨ false 
c  in DIMACS:
-11528  11529  11530  0

c  3 does not represent an automaton state.
c    -(-b^{11, 48}_2 ∧  b^{11, 48}_1 ∧  b^{11, 48}_0 ∧ true) 
c  in CNF:
c     b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ false 
c  in DIMACS:
 11528 -11529 -11530  0
c  -3 does not represent an automaton state.
c    -( b^{11, 48}_2 ∧  b^{11, 48}_1 ∧  b^{11, 48}_0 ∧ true) 
c  in CNF:
c    -b^{11, 48}_2 ∨ -b^{11, 48}_1 ∨ -b^{11, 48}_0 ∨ false 
c  in DIMACS:
-11528 -11529 -11530  0

c i = 49
c  -2+1 --> -1
c    ( b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧  p_539) -> ( b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0)
c  in CNF:
c    -b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨  b^{11, 50}_2
c    -b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_1
c    -b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨  b^{11, 50}_0
c  in DIMACS:
-11531 -11532  11533 -539  11534 0
-11531 -11532  11533 -539 -11535 0
-11531 -11532  11533 -539  11536 0

c  -1+1 --> 0
c    ( b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0 ∧  p_539) -> (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧ -b^{11, 50}_0)
c  in CNF:
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_2
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_1
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_0
c  in DIMACS:
-11531  11532 -11533 -539 -11534 0
-11531  11532 -11533 -539 -11535 0
-11531  11532 -11533 -539 -11536 0

c  0+1 --> 1
c    (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧  p_539) -> (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0)
c  in CNF:
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_2
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_1
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨  b^{11, 50}_0
c  in DIMACS:
 11531  11532  11533 -539 -11534 0
 11531  11532  11533 -539 -11535 0
 11531  11532  11533 -539  11536 0

c  1+1 --> 2
c    (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0 ∧  p_539) -> (-b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0)
c  in CNF:
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_2
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨  b^{11, 50}_1
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ -p_539 ∨ -b^{11, 50}_0
c  in DIMACS:
 11531  11532 -11533 -539 -11534 0
 11531  11532 -11533 -539  11535 0
 11531  11532 -11533 -539 -11536 0

c  2+1 --> break 
c    (-b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧  p_539) -> break
c  in CNF:
c     b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ -p_539 ∨ break
c  in DIMACS:
 11531 -11532  11533 -539 1162 0


c  2-1 --> 1
c    (-b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧ -p_539) -> (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0)
c  in CNF:
c     b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_2
c     b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_1
c     b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨  b^{11, 50}_0
c  in DIMACS:
 11531 -11532  11533  539 -11534 0
 11531 -11532  11533  539 -11535 0
 11531 -11532  11533  539  11536 0

c  1-1 --> 0
c    (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0 ∧ -p_539) -> (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧ -b^{11, 50}_0)
c  in CNF:
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_2
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_1
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_0
c  in DIMACS:
 11531  11532 -11533  539 -11534 0
 11531  11532 -11533  539 -11535 0
 11531  11532 -11533  539 -11536 0

c  0-1 --> -1
c    (-b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧ -p_539) -> ( b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0)
c  in CNF:
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨  b^{11, 50}_2
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_1
c     b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨  b^{11, 50}_0
c  in DIMACS:
 11531  11532  11533  539  11534 0
 11531  11532  11533  539 -11535 0
 11531  11532  11533  539  11536 0

c  -1-1 --> -2
c    ( b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧  b^{11, 49}_0 ∧ -p_539) -> ( b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0)
c  in CNF:
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨  b^{11, 50}_2
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨  b^{11, 50}_1
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨  p_539 ∨ -b^{11, 50}_0
c  in DIMACS:
-11531  11532 -11533  539  11534 0
-11531  11532 -11533  539  11535 0
-11531  11532 -11533  539 -11536 0

c  -2-1 --> break 
c    ( b^{11, 49}_2 ∧  b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧ -p_539) -> break
c  in CNF:
c    -b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨  b^{11, 49}_0 ∨  p_539 ∨ break
c  in DIMACS:
-11531 -11532  11533  539 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 49}_2 ∧ -b^{11, 49}_1 ∧ -b^{11, 49}_0 ∧ true) 
c  in CNF:
c    -b^{11, 49}_2 ∨  b^{11, 49}_1 ∨  b^{11, 49}_0 ∨ false 
c  in DIMACS:
-11531  11532  11533  0

c  3 does not represent an automaton state.
c    -(-b^{11, 49}_2 ∧  b^{11, 49}_1 ∧  b^{11, 49}_0 ∧ true) 
c  in CNF:
c     b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ false 
c  in DIMACS:
 11531 -11532 -11533  0
c  -3 does not represent an automaton state.
c    -( b^{11, 49}_2 ∧  b^{11, 49}_1 ∧  b^{11, 49}_0 ∧ true) 
c  in CNF:
c    -b^{11, 49}_2 ∨ -b^{11, 49}_1 ∨ -b^{11, 49}_0 ∨ false 
c  in DIMACS:
-11531 -11532 -11533  0

c i = 50
c  -2+1 --> -1
c    ( b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧  p_550) -> ( b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0)
c  in CNF:
c    -b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨  b^{11, 51}_2
c    -b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_1
c    -b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨  b^{11, 51}_0
c  in DIMACS:
-11534 -11535  11536 -550  11537 0
-11534 -11535  11536 -550 -11538 0
-11534 -11535  11536 -550  11539 0

c  -1+1 --> 0
c    ( b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0 ∧  p_550) -> (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧ -b^{11, 51}_0)
c  in CNF:
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_2
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_1
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_0
c  in DIMACS:
-11534  11535 -11536 -550 -11537 0
-11534  11535 -11536 -550 -11538 0
-11534  11535 -11536 -550 -11539 0

c  0+1 --> 1
c    (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧  p_550) -> (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0)
c  in CNF:
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_2
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_1
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨  b^{11, 51}_0
c  in DIMACS:
 11534  11535  11536 -550 -11537 0
 11534  11535  11536 -550 -11538 0
 11534  11535  11536 -550  11539 0

c  1+1 --> 2
c    (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0 ∧  p_550) -> (-b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0)
c  in CNF:
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_2
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨  b^{11, 51}_1
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ -p_550 ∨ -b^{11, 51}_0
c  in DIMACS:
 11534  11535 -11536 -550 -11537 0
 11534  11535 -11536 -550  11538 0
 11534  11535 -11536 -550 -11539 0

c  2+1 --> break 
c    (-b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧  p_550) -> break
c  in CNF:
c     b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 11534 -11535  11536 -550 1162 0


c  2-1 --> 1
c    (-b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧ -p_550) -> (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0)
c  in CNF:
c     b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_2
c     b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_1
c     b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨  b^{11, 51}_0
c  in DIMACS:
 11534 -11535  11536  550 -11537 0
 11534 -11535  11536  550 -11538 0
 11534 -11535  11536  550  11539 0

c  1-1 --> 0
c    (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0 ∧ -p_550) -> (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧ -b^{11, 51}_0)
c  in CNF:
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_2
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_1
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_0
c  in DIMACS:
 11534  11535 -11536  550 -11537 0
 11534  11535 -11536  550 -11538 0
 11534  11535 -11536  550 -11539 0

c  0-1 --> -1
c    (-b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧ -p_550) -> ( b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0)
c  in CNF:
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨  b^{11, 51}_2
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_1
c     b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨  b^{11, 51}_0
c  in DIMACS:
 11534  11535  11536  550  11537 0
 11534  11535  11536  550 -11538 0
 11534  11535  11536  550  11539 0

c  -1-1 --> -2
c    ( b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧  b^{11, 50}_0 ∧ -p_550) -> ( b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0)
c  in CNF:
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨  b^{11, 51}_2
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨  b^{11, 51}_1
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨  p_550 ∨ -b^{11, 51}_0
c  in DIMACS:
-11534  11535 -11536  550  11537 0
-11534  11535 -11536  550  11538 0
-11534  11535 -11536  550 -11539 0

c  -2-1 --> break 
c    ( b^{11, 50}_2 ∧  b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨  b^{11, 50}_0 ∨  p_550 ∨ break
c  in DIMACS:
-11534 -11535  11536  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 50}_2 ∧ -b^{11, 50}_1 ∧ -b^{11, 50}_0 ∧ true) 
c  in CNF:
c    -b^{11, 50}_2 ∨  b^{11, 50}_1 ∨  b^{11, 50}_0 ∨ false 
c  in DIMACS:
-11534  11535  11536  0

c  3 does not represent an automaton state.
c    -(-b^{11, 50}_2 ∧  b^{11, 50}_1 ∧  b^{11, 50}_0 ∧ true) 
c  in CNF:
c     b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ false 
c  in DIMACS:
 11534 -11535 -11536  0
c  -3 does not represent an automaton state.
c    -( b^{11, 50}_2 ∧  b^{11, 50}_1 ∧  b^{11, 50}_0 ∧ true) 
c  in CNF:
c    -b^{11, 50}_2 ∨ -b^{11, 50}_1 ∨ -b^{11, 50}_0 ∨ false 
c  in DIMACS:
-11534 -11535 -11536  0

c i = 51
c  -2+1 --> -1
c    ( b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧  p_561) -> ( b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0)
c  in CNF:
c    -b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨  b^{11, 52}_2
c    -b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_1
c    -b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨  b^{11, 52}_0
c  in DIMACS:
-11537 -11538  11539 -561  11540 0
-11537 -11538  11539 -561 -11541 0
-11537 -11538  11539 -561  11542 0

c  -1+1 --> 0
c    ( b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0 ∧  p_561) -> (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧ -b^{11, 52}_0)
c  in CNF:
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_2
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_1
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_0
c  in DIMACS:
-11537  11538 -11539 -561 -11540 0
-11537  11538 -11539 -561 -11541 0
-11537  11538 -11539 -561 -11542 0

c  0+1 --> 1
c    (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧  p_561) -> (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0)
c  in CNF:
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_2
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_1
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨  b^{11, 52}_0
c  in DIMACS:
 11537  11538  11539 -561 -11540 0
 11537  11538  11539 -561 -11541 0
 11537  11538  11539 -561  11542 0

c  1+1 --> 2
c    (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0 ∧  p_561) -> (-b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0)
c  in CNF:
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_2
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨  b^{11, 52}_1
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ -p_561 ∨ -b^{11, 52}_0
c  in DIMACS:
 11537  11538 -11539 -561 -11540 0
 11537  11538 -11539 -561  11541 0
 11537  11538 -11539 -561 -11542 0

c  2+1 --> break 
c    (-b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧  p_561) -> break
c  in CNF:
c     b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 11537 -11538  11539 -561 1162 0


c  2-1 --> 1
c    (-b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧ -p_561) -> (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0)
c  in CNF:
c     b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_2
c     b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_1
c     b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨  b^{11, 52}_0
c  in DIMACS:
 11537 -11538  11539  561 -11540 0
 11537 -11538  11539  561 -11541 0
 11537 -11538  11539  561  11542 0

c  1-1 --> 0
c    (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0 ∧ -p_561) -> (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧ -b^{11, 52}_0)
c  in CNF:
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_2
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_1
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_0
c  in DIMACS:
 11537  11538 -11539  561 -11540 0
 11537  11538 -11539  561 -11541 0
 11537  11538 -11539  561 -11542 0

c  0-1 --> -1
c    (-b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧ -p_561) -> ( b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0)
c  in CNF:
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨  b^{11, 52}_2
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_1
c     b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨  b^{11, 52}_0
c  in DIMACS:
 11537  11538  11539  561  11540 0
 11537  11538  11539  561 -11541 0
 11537  11538  11539  561  11542 0

c  -1-1 --> -2
c    ( b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧  b^{11, 51}_0 ∧ -p_561) -> ( b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0)
c  in CNF:
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨  b^{11, 52}_2
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨  b^{11, 52}_1
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨  p_561 ∨ -b^{11, 52}_0
c  in DIMACS:
-11537  11538 -11539  561  11540 0
-11537  11538 -11539  561  11541 0
-11537  11538 -11539  561 -11542 0

c  -2-1 --> break 
c    ( b^{11, 51}_2 ∧  b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨  b^{11, 51}_0 ∨  p_561 ∨ break
c  in DIMACS:
-11537 -11538  11539  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 51}_2 ∧ -b^{11, 51}_1 ∧ -b^{11, 51}_0 ∧ true) 
c  in CNF:
c    -b^{11, 51}_2 ∨  b^{11, 51}_1 ∨  b^{11, 51}_0 ∨ false 
c  in DIMACS:
-11537  11538  11539  0

c  3 does not represent an automaton state.
c    -(-b^{11, 51}_2 ∧  b^{11, 51}_1 ∧  b^{11, 51}_0 ∧ true) 
c  in CNF:
c     b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ false 
c  in DIMACS:
 11537 -11538 -11539  0
c  -3 does not represent an automaton state.
c    -( b^{11, 51}_2 ∧  b^{11, 51}_1 ∧  b^{11, 51}_0 ∧ true) 
c  in CNF:
c    -b^{11, 51}_2 ∨ -b^{11, 51}_1 ∨ -b^{11, 51}_0 ∨ false 
c  in DIMACS:
-11537 -11538 -11539  0

c i = 52
c  -2+1 --> -1
c    ( b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧  p_572) -> ( b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0)
c  in CNF:
c    -b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨  b^{11, 53}_2
c    -b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_1
c    -b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨  b^{11, 53}_0
c  in DIMACS:
-11540 -11541  11542 -572  11543 0
-11540 -11541  11542 -572 -11544 0
-11540 -11541  11542 -572  11545 0

c  -1+1 --> 0
c    ( b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0 ∧  p_572) -> (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧ -b^{11, 53}_0)
c  in CNF:
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_2
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_1
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_0
c  in DIMACS:
-11540  11541 -11542 -572 -11543 0
-11540  11541 -11542 -572 -11544 0
-11540  11541 -11542 -572 -11545 0

c  0+1 --> 1
c    (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧  p_572) -> (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0)
c  in CNF:
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_2
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_1
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨  b^{11, 53}_0
c  in DIMACS:
 11540  11541  11542 -572 -11543 0
 11540  11541  11542 -572 -11544 0
 11540  11541  11542 -572  11545 0

c  1+1 --> 2
c    (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0 ∧  p_572) -> (-b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0)
c  in CNF:
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_2
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨  b^{11, 53}_1
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ -p_572 ∨ -b^{11, 53}_0
c  in DIMACS:
 11540  11541 -11542 -572 -11543 0
 11540  11541 -11542 -572  11544 0
 11540  11541 -11542 -572 -11545 0

c  2+1 --> break 
c    (-b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧  p_572) -> break
c  in CNF:
c     b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 11540 -11541  11542 -572 1162 0


c  2-1 --> 1
c    (-b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧ -p_572) -> (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0)
c  in CNF:
c     b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_2
c     b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_1
c     b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨  b^{11, 53}_0
c  in DIMACS:
 11540 -11541  11542  572 -11543 0
 11540 -11541  11542  572 -11544 0
 11540 -11541  11542  572  11545 0

c  1-1 --> 0
c    (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0 ∧ -p_572) -> (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧ -b^{11, 53}_0)
c  in CNF:
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_2
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_1
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_0
c  in DIMACS:
 11540  11541 -11542  572 -11543 0
 11540  11541 -11542  572 -11544 0
 11540  11541 -11542  572 -11545 0

c  0-1 --> -1
c    (-b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧ -p_572) -> ( b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0)
c  in CNF:
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨  b^{11, 53}_2
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_1
c     b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨  b^{11, 53}_0
c  in DIMACS:
 11540  11541  11542  572  11543 0
 11540  11541  11542  572 -11544 0
 11540  11541  11542  572  11545 0

c  -1-1 --> -2
c    ( b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧  b^{11, 52}_0 ∧ -p_572) -> ( b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0)
c  in CNF:
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨  b^{11, 53}_2
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨  b^{11, 53}_1
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨  p_572 ∨ -b^{11, 53}_0
c  in DIMACS:
-11540  11541 -11542  572  11543 0
-11540  11541 -11542  572  11544 0
-11540  11541 -11542  572 -11545 0

c  -2-1 --> break 
c    ( b^{11, 52}_2 ∧  b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨  b^{11, 52}_0 ∨  p_572 ∨ break
c  in DIMACS:
-11540 -11541  11542  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 52}_2 ∧ -b^{11, 52}_1 ∧ -b^{11, 52}_0 ∧ true) 
c  in CNF:
c    -b^{11, 52}_2 ∨  b^{11, 52}_1 ∨  b^{11, 52}_0 ∨ false 
c  in DIMACS:
-11540  11541  11542  0

c  3 does not represent an automaton state.
c    -(-b^{11, 52}_2 ∧  b^{11, 52}_1 ∧  b^{11, 52}_0 ∧ true) 
c  in CNF:
c     b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ false 
c  in DIMACS:
 11540 -11541 -11542  0
c  -3 does not represent an automaton state.
c    -( b^{11, 52}_2 ∧  b^{11, 52}_1 ∧  b^{11, 52}_0 ∧ true) 
c  in CNF:
c    -b^{11, 52}_2 ∨ -b^{11, 52}_1 ∨ -b^{11, 52}_0 ∨ false 
c  in DIMACS:
-11540 -11541 -11542  0

c i = 53
c  -2+1 --> -1
c    ( b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧  p_583) -> ( b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0)
c  in CNF:
c    -b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨  b^{11, 54}_2
c    -b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_1
c    -b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨  b^{11, 54}_0
c  in DIMACS:
-11543 -11544  11545 -583  11546 0
-11543 -11544  11545 -583 -11547 0
-11543 -11544  11545 -583  11548 0

c  -1+1 --> 0
c    ( b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0 ∧  p_583) -> (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧ -b^{11, 54}_0)
c  in CNF:
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_2
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_1
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_0
c  in DIMACS:
-11543  11544 -11545 -583 -11546 0
-11543  11544 -11545 -583 -11547 0
-11543  11544 -11545 -583 -11548 0

c  0+1 --> 1
c    (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧  p_583) -> (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0)
c  in CNF:
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_2
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_1
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨  b^{11, 54}_0
c  in DIMACS:
 11543  11544  11545 -583 -11546 0
 11543  11544  11545 -583 -11547 0
 11543  11544  11545 -583  11548 0

c  1+1 --> 2
c    (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0 ∧  p_583) -> (-b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0)
c  in CNF:
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_2
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨  b^{11, 54}_1
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ -p_583 ∨ -b^{11, 54}_0
c  in DIMACS:
 11543  11544 -11545 -583 -11546 0
 11543  11544 -11545 -583  11547 0
 11543  11544 -11545 -583 -11548 0

c  2+1 --> break 
c    (-b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧  p_583) -> break
c  in CNF:
c     b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ -p_583 ∨ break
c  in DIMACS:
 11543 -11544  11545 -583 1162 0


c  2-1 --> 1
c    (-b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧ -p_583) -> (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0)
c  in CNF:
c     b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_2
c     b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_1
c     b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨  b^{11, 54}_0
c  in DIMACS:
 11543 -11544  11545  583 -11546 0
 11543 -11544  11545  583 -11547 0
 11543 -11544  11545  583  11548 0

c  1-1 --> 0
c    (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0 ∧ -p_583) -> (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧ -b^{11, 54}_0)
c  in CNF:
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_2
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_1
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_0
c  in DIMACS:
 11543  11544 -11545  583 -11546 0
 11543  11544 -11545  583 -11547 0
 11543  11544 -11545  583 -11548 0

c  0-1 --> -1
c    (-b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧ -p_583) -> ( b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0)
c  in CNF:
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨  b^{11, 54}_2
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_1
c     b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨  b^{11, 54}_0
c  in DIMACS:
 11543  11544  11545  583  11546 0
 11543  11544  11545  583 -11547 0
 11543  11544  11545  583  11548 0

c  -1-1 --> -2
c    ( b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧  b^{11, 53}_0 ∧ -p_583) -> ( b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0)
c  in CNF:
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨  b^{11, 54}_2
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨  b^{11, 54}_1
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨  p_583 ∨ -b^{11, 54}_0
c  in DIMACS:
-11543  11544 -11545  583  11546 0
-11543  11544 -11545  583  11547 0
-11543  11544 -11545  583 -11548 0

c  -2-1 --> break 
c    ( b^{11, 53}_2 ∧  b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧ -p_583) -> break
c  in CNF:
c    -b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨  b^{11, 53}_0 ∨  p_583 ∨ break
c  in DIMACS:
-11543 -11544  11545  583 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 53}_2 ∧ -b^{11, 53}_1 ∧ -b^{11, 53}_0 ∧ true) 
c  in CNF:
c    -b^{11, 53}_2 ∨  b^{11, 53}_1 ∨  b^{11, 53}_0 ∨ false 
c  in DIMACS:
-11543  11544  11545  0

c  3 does not represent an automaton state.
c    -(-b^{11, 53}_2 ∧  b^{11, 53}_1 ∧  b^{11, 53}_0 ∧ true) 
c  in CNF:
c     b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ false 
c  in DIMACS:
 11543 -11544 -11545  0
c  -3 does not represent an automaton state.
c    -( b^{11, 53}_2 ∧  b^{11, 53}_1 ∧  b^{11, 53}_0 ∧ true) 
c  in CNF:
c    -b^{11, 53}_2 ∨ -b^{11, 53}_1 ∨ -b^{11, 53}_0 ∨ false 
c  in DIMACS:
-11543 -11544 -11545  0

c i = 54
c  -2+1 --> -1
c    ( b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧  p_594) -> ( b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0)
c  in CNF:
c    -b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨  b^{11, 55}_2
c    -b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_1
c    -b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨  b^{11, 55}_0
c  in DIMACS:
-11546 -11547  11548 -594  11549 0
-11546 -11547  11548 -594 -11550 0
-11546 -11547  11548 -594  11551 0

c  -1+1 --> 0
c    ( b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0 ∧  p_594) -> (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧ -b^{11, 55}_0)
c  in CNF:
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_2
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_1
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_0
c  in DIMACS:
-11546  11547 -11548 -594 -11549 0
-11546  11547 -11548 -594 -11550 0
-11546  11547 -11548 -594 -11551 0

c  0+1 --> 1
c    (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧  p_594) -> (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0)
c  in CNF:
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_2
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_1
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨  b^{11, 55}_0
c  in DIMACS:
 11546  11547  11548 -594 -11549 0
 11546  11547  11548 -594 -11550 0
 11546  11547  11548 -594  11551 0

c  1+1 --> 2
c    (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0 ∧  p_594) -> (-b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0)
c  in CNF:
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_2
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨  b^{11, 55}_1
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ -p_594 ∨ -b^{11, 55}_0
c  in DIMACS:
 11546  11547 -11548 -594 -11549 0
 11546  11547 -11548 -594  11550 0
 11546  11547 -11548 -594 -11551 0

c  2+1 --> break 
c    (-b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧  p_594) -> break
c  in CNF:
c     b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 11546 -11547  11548 -594 1162 0


c  2-1 --> 1
c    (-b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧ -p_594) -> (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0)
c  in CNF:
c     b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_2
c     b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_1
c     b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨  b^{11, 55}_0
c  in DIMACS:
 11546 -11547  11548  594 -11549 0
 11546 -11547  11548  594 -11550 0
 11546 -11547  11548  594  11551 0

c  1-1 --> 0
c    (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0 ∧ -p_594) -> (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧ -b^{11, 55}_0)
c  in CNF:
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_2
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_1
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_0
c  in DIMACS:
 11546  11547 -11548  594 -11549 0
 11546  11547 -11548  594 -11550 0
 11546  11547 -11548  594 -11551 0

c  0-1 --> -1
c    (-b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧ -p_594) -> ( b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0)
c  in CNF:
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨  b^{11, 55}_2
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_1
c     b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨  b^{11, 55}_0
c  in DIMACS:
 11546  11547  11548  594  11549 0
 11546  11547  11548  594 -11550 0
 11546  11547  11548  594  11551 0

c  -1-1 --> -2
c    ( b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧  b^{11, 54}_0 ∧ -p_594) -> ( b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0)
c  in CNF:
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨  b^{11, 55}_2
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨  b^{11, 55}_1
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨  p_594 ∨ -b^{11, 55}_0
c  in DIMACS:
-11546  11547 -11548  594  11549 0
-11546  11547 -11548  594  11550 0
-11546  11547 -11548  594 -11551 0

c  -2-1 --> break 
c    ( b^{11, 54}_2 ∧  b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨  b^{11, 54}_0 ∨  p_594 ∨ break
c  in DIMACS:
-11546 -11547  11548  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 54}_2 ∧ -b^{11, 54}_1 ∧ -b^{11, 54}_0 ∧ true) 
c  in CNF:
c    -b^{11, 54}_2 ∨  b^{11, 54}_1 ∨  b^{11, 54}_0 ∨ false 
c  in DIMACS:
-11546  11547  11548  0

c  3 does not represent an automaton state.
c    -(-b^{11, 54}_2 ∧  b^{11, 54}_1 ∧  b^{11, 54}_0 ∧ true) 
c  in CNF:
c     b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ false 
c  in DIMACS:
 11546 -11547 -11548  0
c  -3 does not represent an automaton state.
c    -( b^{11, 54}_2 ∧  b^{11, 54}_1 ∧  b^{11, 54}_0 ∧ true) 
c  in CNF:
c    -b^{11, 54}_2 ∨ -b^{11, 54}_1 ∨ -b^{11, 54}_0 ∨ false 
c  in DIMACS:
-11546 -11547 -11548  0

c i = 55
c  -2+1 --> -1
c    ( b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧  p_605) -> ( b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0)
c  in CNF:
c    -b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨  b^{11, 56}_2
c    -b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_1
c    -b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨  b^{11, 56}_0
c  in DIMACS:
-11549 -11550  11551 -605  11552 0
-11549 -11550  11551 -605 -11553 0
-11549 -11550  11551 -605  11554 0

c  -1+1 --> 0
c    ( b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0 ∧  p_605) -> (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧ -b^{11, 56}_0)
c  in CNF:
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_2
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_1
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_0
c  in DIMACS:
-11549  11550 -11551 -605 -11552 0
-11549  11550 -11551 -605 -11553 0
-11549  11550 -11551 -605 -11554 0

c  0+1 --> 1
c    (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧  p_605) -> (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0)
c  in CNF:
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_2
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_1
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨  b^{11, 56}_0
c  in DIMACS:
 11549  11550  11551 -605 -11552 0
 11549  11550  11551 -605 -11553 0
 11549  11550  11551 -605  11554 0

c  1+1 --> 2
c    (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0 ∧  p_605) -> (-b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0)
c  in CNF:
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_2
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨  b^{11, 56}_1
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ -p_605 ∨ -b^{11, 56}_0
c  in DIMACS:
 11549  11550 -11551 -605 -11552 0
 11549  11550 -11551 -605  11553 0
 11549  11550 -11551 -605 -11554 0

c  2+1 --> break 
c    (-b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧  p_605) -> break
c  in CNF:
c     b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ -p_605 ∨ break
c  in DIMACS:
 11549 -11550  11551 -605 1162 0


c  2-1 --> 1
c    (-b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧ -p_605) -> (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0)
c  in CNF:
c     b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_2
c     b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_1
c     b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨  b^{11, 56}_0
c  in DIMACS:
 11549 -11550  11551  605 -11552 0
 11549 -11550  11551  605 -11553 0
 11549 -11550  11551  605  11554 0

c  1-1 --> 0
c    (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0 ∧ -p_605) -> (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧ -b^{11, 56}_0)
c  in CNF:
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_2
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_1
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_0
c  in DIMACS:
 11549  11550 -11551  605 -11552 0
 11549  11550 -11551  605 -11553 0
 11549  11550 -11551  605 -11554 0

c  0-1 --> -1
c    (-b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧ -p_605) -> ( b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0)
c  in CNF:
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨  b^{11, 56}_2
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_1
c     b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨  b^{11, 56}_0
c  in DIMACS:
 11549  11550  11551  605  11552 0
 11549  11550  11551  605 -11553 0
 11549  11550  11551  605  11554 0

c  -1-1 --> -2
c    ( b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧  b^{11, 55}_0 ∧ -p_605) -> ( b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0)
c  in CNF:
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨  b^{11, 56}_2
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨  b^{11, 56}_1
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨  p_605 ∨ -b^{11, 56}_0
c  in DIMACS:
-11549  11550 -11551  605  11552 0
-11549  11550 -11551  605  11553 0
-11549  11550 -11551  605 -11554 0

c  -2-1 --> break 
c    ( b^{11, 55}_2 ∧  b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧ -p_605) -> break
c  in CNF:
c    -b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨  b^{11, 55}_0 ∨  p_605 ∨ break
c  in DIMACS:
-11549 -11550  11551  605 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 55}_2 ∧ -b^{11, 55}_1 ∧ -b^{11, 55}_0 ∧ true) 
c  in CNF:
c    -b^{11, 55}_2 ∨  b^{11, 55}_1 ∨  b^{11, 55}_0 ∨ false 
c  in DIMACS:
-11549  11550  11551  0

c  3 does not represent an automaton state.
c    -(-b^{11, 55}_2 ∧  b^{11, 55}_1 ∧  b^{11, 55}_0 ∧ true) 
c  in CNF:
c     b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ false 
c  in DIMACS:
 11549 -11550 -11551  0
c  -3 does not represent an automaton state.
c    -( b^{11, 55}_2 ∧  b^{11, 55}_1 ∧  b^{11, 55}_0 ∧ true) 
c  in CNF:
c    -b^{11, 55}_2 ∨ -b^{11, 55}_1 ∨ -b^{11, 55}_0 ∨ false 
c  in DIMACS:
-11549 -11550 -11551  0

c i = 56
c  -2+1 --> -1
c    ( b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧  p_616) -> ( b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0)
c  in CNF:
c    -b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨  b^{11, 57}_2
c    -b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_1
c    -b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨  b^{11, 57}_0
c  in DIMACS:
-11552 -11553  11554 -616  11555 0
-11552 -11553  11554 -616 -11556 0
-11552 -11553  11554 -616  11557 0

c  -1+1 --> 0
c    ( b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0 ∧  p_616) -> (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧ -b^{11, 57}_0)
c  in CNF:
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_2
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_1
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_0
c  in DIMACS:
-11552  11553 -11554 -616 -11555 0
-11552  11553 -11554 -616 -11556 0
-11552  11553 -11554 -616 -11557 0

c  0+1 --> 1
c    (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧  p_616) -> (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0)
c  in CNF:
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_2
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_1
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨  b^{11, 57}_0
c  in DIMACS:
 11552  11553  11554 -616 -11555 0
 11552  11553  11554 -616 -11556 0
 11552  11553  11554 -616  11557 0

c  1+1 --> 2
c    (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0 ∧  p_616) -> (-b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0)
c  in CNF:
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_2
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨  b^{11, 57}_1
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ -p_616 ∨ -b^{11, 57}_0
c  in DIMACS:
 11552  11553 -11554 -616 -11555 0
 11552  11553 -11554 -616  11556 0
 11552  11553 -11554 -616 -11557 0

c  2+1 --> break 
c    (-b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧  p_616) -> break
c  in CNF:
c     b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 11552 -11553  11554 -616 1162 0


c  2-1 --> 1
c    (-b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧ -p_616) -> (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0)
c  in CNF:
c     b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_2
c     b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_1
c     b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨  b^{11, 57}_0
c  in DIMACS:
 11552 -11553  11554  616 -11555 0
 11552 -11553  11554  616 -11556 0
 11552 -11553  11554  616  11557 0

c  1-1 --> 0
c    (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0 ∧ -p_616) -> (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧ -b^{11, 57}_0)
c  in CNF:
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_2
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_1
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_0
c  in DIMACS:
 11552  11553 -11554  616 -11555 0
 11552  11553 -11554  616 -11556 0
 11552  11553 -11554  616 -11557 0

c  0-1 --> -1
c    (-b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧ -p_616) -> ( b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0)
c  in CNF:
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨  b^{11, 57}_2
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_1
c     b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨  b^{11, 57}_0
c  in DIMACS:
 11552  11553  11554  616  11555 0
 11552  11553  11554  616 -11556 0
 11552  11553  11554  616  11557 0

c  -1-1 --> -2
c    ( b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧  b^{11, 56}_0 ∧ -p_616) -> ( b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0)
c  in CNF:
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨  b^{11, 57}_2
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨  b^{11, 57}_1
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨  p_616 ∨ -b^{11, 57}_0
c  in DIMACS:
-11552  11553 -11554  616  11555 0
-11552  11553 -11554  616  11556 0
-11552  11553 -11554  616 -11557 0

c  -2-1 --> break 
c    ( b^{11, 56}_2 ∧  b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨  b^{11, 56}_0 ∨  p_616 ∨ break
c  in DIMACS:
-11552 -11553  11554  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 56}_2 ∧ -b^{11, 56}_1 ∧ -b^{11, 56}_0 ∧ true) 
c  in CNF:
c    -b^{11, 56}_2 ∨  b^{11, 56}_1 ∨  b^{11, 56}_0 ∨ false 
c  in DIMACS:
-11552  11553  11554  0

c  3 does not represent an automaton state.
c    -(-b^{11, 56}_2 ∧  b^{11, 56}_1 ∧  b^{11, 56}_0 ∧ true) 
c  in CNF:
c     b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ false 
c  in DIMACS:
 11552 -11553 -11554  0
c  -3 does not represent an automaton state.
c    -( b^{11, 56}_2 ∧  b^{11, 56}_1 ∧  b^{11, 56}_0 ∧ true) 
c  in CNF:
c    -b^{11, 56}_2 ∨ -b^{11, 56}_1 ∨ -b^{11, 56}_0 ∨ false 
c  in DIMACS:
-11552 -11553 -11554  0

c i = 57
c  -2+1 --> -1
c    ( b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧  p_627) -> ( b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0)
c  in CNF:
c    -b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨  b^{11, 58}_2
c    -b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_1
c    -b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨  b^{11, 58}_0
c  in DIMACS:
-11555 -11556  11557 -627  11558 0
-11555 -11556  11557 -627 -11559 0
-11555 -11556  11557 -627  11560 0

c  -1+1 --> 0
c    ( b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0 ∧  p_627) -> (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧ -b^{11, 58}_0)
c  in CNF:
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_2
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_1
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_0
c  in DIMACS:
-11555  11556 -11557 -627 -11558 0
-11555  11556 -11557 -627 -11559 0
-11555  11556 -11557 -627 -11560 0

c  0+1 --> 1
c    (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧  p_627) -> (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0)
c  in CNF:
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_2
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_1
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨  b^{11, 58}_0
c  in DIMACS:
 11555  11556  11557 -627 -11558 0
 11555  11556  11557 -627 -11559 0
 11555  11556  11557 -627  11560 0

c  1+1 --> 2
c    (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0 ∧  p_627) -> (-b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0)
c  in CNF:
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_2
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨  b^{11, 58}_1
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ -p_627 ∨ -b^{11, 58}_0
c  in DIMACS:
 11555  11556 -11557 -627 -11558 0
 11555  11556 -11557 -627  11559 0
 11555  11556 -11557 -627 -11560 0

c  2+1 --> break 
c    (-b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧  p_627) -> break
c  in CNF:
c     b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 11555 -11556  11557 -627 1162 0


c  2-1 --> 1
c    (-b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧ -p_627) -> (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0)
c  in CNF:
c     b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_2
c     b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_1
c     b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨  b^{11, 58}_0
c  in DIMACS:
 11555 -11556  11557  627 -11558 0
 11555 -11556  11557  627 -11559 0
 11555 -11556  11557  627  11560 0

c  1-1 --> 0
c    (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0 ∧ -p_627) -> (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧ -b^{11, 58}_0)
c  in CNF:
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_2
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_1
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_0
c  in DIMACS:
 11555  11556 -11557  627 -11558 0
 11555  11556 -11557  627 -11559 0
 11555  11556 -11557  627 -11560 0

c  0-1 --> -1
c    (-b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧ -p_627) -> ( b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0)
c  in CNF:
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨  b^{11, 58}_2
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_1
c     b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨  b^{11, 58}_0
c  in DIMACS:
 11555  11556  11557  627  11558 0
 11555  11556  11557  627 -11559 0
 11555  11556  11557  627  11560 0

c  -1-1 --> -2
c    ( b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧  b^{11, 57}_0 ∧ -p_627) -> ( b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0)
c  in CNF:
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨  b^{11, 58}_2
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨  b^{11, 58}_1
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨  p_627 ∨ -b^{11, 58}_0
c  in DIMACS:
-11555  11556 -11557  627  11558 0
-11555  11556 -11557  627  11559 0
-11555  11556 -11557  627 -11560 0

c  -2-1 --> break 
c    ( b^{11, 57}_2 ∧  b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨  b^{11, 57}_0 ∨  p_627 ∨ break
c  in DIMACS:
-11555 -11556  11557  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 57}_2 ∧ -b^{11, 57}_1 ∧ -b^{11, 57}_0 ∧ true) 
c  in CNF:
c    -b^{11, 57}_2 ∨  b^{11, 57}_1 ∨  b^{11, 57}_0 ∨ false 
c  in DIMACS:
-11555  11556  11557  0

c  3 does not represent an automaton state.
c    -(-b^{11, 57}_2 ∧  b^{11, 57}_1 ∧  b^{11, 57}_0 ∧ true) 
c  in CNF:
c     b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ false 
c  in DIMACS:
 11555 -11556 -11557  0
c  -3 does not represent an automaton state.
c    -( b^{11, 57}_2 ∧  b^{11, 57}_1 ∧  b^{11, 57}_0 ∧ true) 
c  in CNF:
c    -b^{11, 57}_2 ∨ -b^{11, 57}_1 ∨ -b^{11, 57}_0 ∨ false 
c  in DIMACS:
-11555 -11556 -11557  0

c i = 58
c  -2+1 --> -1
c    ( b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧  p_638) -> ( b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0)
c  in CNF:
c    -b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨  b^{11, 59}_2
c    -b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_1
c    -b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨  b^{11, 59}_0
c  in DIMACS:
-11558 -11559  11560 -638  11561 0
-11558 -11559  11560 -638 -11562 0
-11558 -11559  11560 -638  11563 0

c  -1+1 --> 0
c    ( b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0 ∧  p_638) -> (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧ -b^{11, 59}_0)
c  in CNF:
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_2
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_1
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_0
c  in DIMACS:
-11558  11559 -11560 -638 -11561 0
-11558  11559 -11560 -638 -11562 0
-11558  11559 -11560 -638 -11563 0

c  0+1 --> 1
c    (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧  p_638) -> (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0)
c  in CNF:
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_2
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_1
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨  b^{11, 59}_0
c  in DIMACS:
 11558  11559  11560 -638 -11561 0
 11558  11559  11560 -638 -11562 0
 11558  11559  11560 -638  11563 0

c  1+1 --> 2
c    (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0 ∧  p_638) -> (-b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0)
c  in CNF:
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_2
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨  b^{11, 59}_1
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ -p_638 ∨ -b^{11, 59}_0
c  in DIMACS:
 11558  11559 -11560 -638 -11561 0
 11558  11559 -11560 -638  11562 0
 11558  11559 -11560 -638 -11563 0

c  2+1 --> break 
c    (-b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧  p_638) -> break
c  in CNF:
c     b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 11558 -11559  11560 -638 1162 0


c  2-1 --> 1
c    (-b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧ -p_638) -> (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0)
c  in CNF:
c     b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_2
c     b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_1
c     b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨  b^{11, 59}_0
c  in DIMACS:
 11558 -11559  11560  638 -11561 0
 11558 -11559  11560  638 -11562 0
 11558 -11559  11560  638  11563 0

c  1-1 --> 0
c    (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0 ∧ -p_638) -> (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧ -b^{11, 59}_0)
c  in CNF:
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_2
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_1
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_0
c  in DIMACS:
 11558  11559 -11560  638 -11561 0
 11558  11559 -11560  638 -11562 0
 11558  11559 -11560  638 -11563 0

c  0-1 --> -1
c    (-b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧ -p_638) -> ( b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0)
c  in CNF:
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨  b^{11, 59}_2
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_1
c     b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨  b^{11, 59}_0
c  in DIMACS:
 11558  11559  11560  638  11561 0
 11558  11559  11560  638 -11562 0
 11558  11559  11560  638  11563 0

c  -1-1 --> -2
c    ( b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧  b^{11, 58}_0 ∧ -p_638) -> ( b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0)
c  in CNF:
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨  b^{11, 59}_2
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨  b^{11, 59}_1
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨  p_638 ∨ -b^{11, 59}_0
c  in DIMACS:
-11558  11559 -11560  638  11561 0
-11558  11559 -11560  638  11562 0
-11558  11559 -11560  638 -11563 0

c  -2-1 --> break 
c    ( b^{11, 58}_2 ∧  b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨  b^{11, 58}_0 ∨  p_638 ∨ break
c  in DIMACS:
-11558 -11559  11560  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 58}_2 ∧ -b^{11, 58}_1 ∧ -b^{11, 58}_0 ∧ true) 
c  in CNF:
c    -b^{11, 58}_2 ∨  b^{11, 58}_1 ∨  b^{11, 58}_0 ∨ false 
c  in DIMACS:
-11558  11559  11560  0

c  3 does not represent an automaton state.
c    -(-b^{11, 58}_2 ∧  b^{11, 58}_1 ∧  b^{11, 58}_0 ∧ true) 
c  in CNF:
c     b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ false 
c  in DIMACS:
 11558 -11559 -11560  0
c  -3 does not represent an automaton state.
c    -( b^{11, 58}_2 ∧  b^{11, 58}_1 ∧  b^{11, 58}_0 ∧ true) 
c  in CNF:
c    -b^{11, 58}_2 ∨ -b^{11, 58}_1 ∨ -b^{11, 58}_0 ∨ false 
c  in DIMACS:
-11558 -11559 -11560  0

c i = 59
c  -2+1 --> -1
c    ( b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧  p_649) -> ( b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0)
c  in CNF:
c    -b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨  b^{11, 60}_2
c    -b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_1
c    -b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨  b^{11, 60}_0
c  in DIMACS:
-11561 -11562  11563 -649  11564 0
-11561 -11562  11563 -649 -11565 0
-11561 -11562  11563 -649  11566 0

c  -1+1 --> 0
c    ( b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0 ∧  p_649) -> (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧ -b^{11, 60}_0)
c  in CNF:
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_2
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_1
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_0
c  in DIMACS:
-11561  11562 -11563 -649 -11564 0
-11561  11562 -11563 -649 -11565 0
-11561  11562 -11563 -649 -11566 0

c  0+1 --> 1
c    (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧  p_649) -> (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0)
c  in CNF:
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_2
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_1
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨  b^{11, 60}_0
c  in DIMACS:
 11561  11562  11563 -649 -11564 0
 11561  11562  11563 -649 -11565 0
 11561  11562  11563 -649  11566 0

c  1+1 --> 2
c    (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0 ∧  p_649) -> (-b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0)
c  in CNF:
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_2
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨  b^{11, 60}_1
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ -p_649 ∨ -b^{11, 60}_0
c  in DIMACS:
 11561  11562 -11563 -649 -11564 0
 11561  11562 -11563 -649  11565 0
 11561  11562 -11563 -649 -11566 0

c  2+1 --> break 
c    (-b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧  p_649) -> break
c  in CNF:
c     b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ -p_649 ∨ break
c  in DIMACS:
 11561 -11562  11563 -649 1162 0


c  2-1 --> 1
c    (-b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧ -p_649) -> (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0)
c  in CNF:
c     b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_2
c     b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_1
c     b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨  b^{11, 60}_0
c  in DIMACS:
 11561 -11562  11563  649 -11564 0
 11561 -11562  11563  649 -11565 0
 11561 -11562  11563  649  11566 0

c  1-1 --> 0
c    (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0 ∧ -p_649) -> (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧ -b^{11, 60}_0)
c  in CNF:
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_2
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_1
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_0
c  in DIMACS:
 11561  11562 -11563  649 -11564 0
 11561  11562 -11563  649 -11565 0
 11561  11562 -11563  649 -11566 0

c  0-1 --> -1
c    (-b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧ -p_649) -> ( b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0)
c  in CNF:
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨  b^{11, 60}_2
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_1
c     b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨  b^{11, 60}_0
c  in DIMACS:
 11561  11562  11563  649  11564 0
 11561  11562  11563  649 -11565 0
 11561  11562  11563  649  11566 0

c  -1-1 --> -2
c    ( b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧  b^{11, 59}_0 ∧ -p_649) -> ( b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0)
c  in CNF:
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨  b^{11, 60}_2
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨  b^{11, 60}_1
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨  p_649 ∨ -b^{11, 60}_0
c  in DIMACS:
-11561  11562 -11563  649  11564 0
-11561  11562 -11563  649  11565 0
-11561  11562 -11563  649 -11566 0

c  -2-1 --> break 
c    ( b^{11, 59}_2 ∧  b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧ -p_649) -> break
c  in CNF:
c    -b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨  b^{11, 59}_0 ∨  p_649 ∨ break
c  in DIMACS:
-11561 -11562  11563  649 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 59}_2 ∧ -b^{11, 59}_1 ∧ -b^{11, 59}_0 ∧ true) 
c  in CNF:
c    -b^{11, 59}_2 ∨  b^{11, 59}_1 ∨  b^{11, 59}_0 ∨ false 
c  in DIMACS:
-11561  11562  11563  0

c  3 does not represent an automaton state.
c    -(-b^{11, 59}_2 ∧  b^{11, 59}_1 ∧  b^{11, 59}_0 ∧ true) 
c  in CNF:
c     b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ false 
c  in DIMACS:
 11561 -11562 -11563  0
c  -3 does not represent an automaton state.
c    -( b^{11, 59}_2 ∧  b^{11, 59}_1 ∧  b^{11, 59}_0 ∧ true) 
c  in CNF:
c    -b^{11, 59}_2 ∨ -b^{11, 59}_1 ∨ -b^{11, 59}_0 ∨ false 
c  in DIMACS:
-11561 -11562 -11563  0

c i = 60
c  -2+1 --> -1
c    ( b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧  p_660) -> ( b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0)
c  in CNF:
c    -b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨  b^{11, 61}_2
c    -b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_1
c    -b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨  b^{11, 61}_0
c  in DIMACS:
-11564 -11565  11566 -660  11567 0
-11564 -11565  11566 -660 -11568 0
-11564 -11565  11566 -660  11569 0

c  -1+1 --> 0
c    ( b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0 ∧  p_660) -> (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧ -b^{11, 61}_0)
c  in CNF:
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_2
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_1
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_0
c  in DIMACS:
-11564  11565 -11566 -660 -11567 0
-11564  11565 -11566 -660 -11568 0
-11564  11565 -11566 -660 -11569 0

c  0+1 --> 1
c    (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧  p_660) -> (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0)
c  in CNF:
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_2
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_1
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨  b^{11, 61}_0
c  in DIMACS:
 11564  11565  11566 -660 -11567 0
 11564  11565  11566 -660 -11568 0
 11564  11565  11566 -660  11569 0

c  1+1 --> 2
c    (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0 ∧  p_660) -> (-b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0)
c  in CNF:
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_2
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨  b^{11, 61}_1
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ -p_660 ∨ -b^{11, 61}_0
c  in DIMACS:
 11564  11565 -11566 -660 -11567 0
 11564  11565 -11566 -660  11568 0
 11564  11565 -11566 -660 -11569 0

c  2+1 --> break 
c    (-b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧  p_660) -> break
c  in CNF:
c     b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 11564 -11565  11566 -660 1162 0


c  2-1 --> 1
c    (-b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧ -p_660) -> (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0)
c  in CNF:
c     b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_2
c     b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_1
c     b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨  b^{11, 61}_0
c  in DIMACS:
 11564 -11565  11566  660 -11567 0
 11564 -11565  11566  660 -11568 0
 11564 -11565  11566  660  11569 0

c  1-1 --> 0
c    (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0 ∧ -p_660) -> (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧ -b^{11, 61}_0)
c  in CNF:
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_2
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_1
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_0
c  in DIMACS:
 11564  11565 -11566  660 -11567 0
 11564  11565 -11566  660 -11568 0
 11564  11565 -11566  660 -11569 0

c  0-1 --> -1
c    (-b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧ -p_660) -> ( b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0)
c  in CNF:
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨  b^{11, 61}_2
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_1
c     b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨  b^{11, 61}_0
c  in DIMACS:
 11564  11565  11566  660  11567 0
 11564  11565  11566  660 -11568 0
 11564  11565  11566  660  11569 0

c  -1-1 --> -2
c    ( b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧  b^{11, 60}_0 ∧ -p_660) -> ( b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0)
c  in CNF:
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨  b^{11, 61}_2
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨  b^{11, 61}_1
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨  p_660 ∨ -b^{11, 61}_0
c  in DIMACS:
-11564  11565 -11566  660  11567 0
-11564  11565 -11566  660  11568 0
-11564  11565 -11566  660 -11569 0

c  -2-1 --> break 
c    ( b^{11, 60}_2 ∧  b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨  b^{11, 60}_0 ∨  p_660 ∨ break
c  in DIMACS:
-11564 -11565  11566  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 60}_2 ∧ -b^{11, 60}_1 ∧ -b^{11, 60}_0 ∧ true) 
c  in CNF:
c    -b^{11, 60}_2 ∨  b^{11, 60}_1 ∨  b^{11, 60}_0 ∨ false 
c  in DIMACS:
-11564  11565  11566  0

c  3 does not represent an automaton state.
c    -(-b^{11, 60}_2 ∧  b^{11, 60}_1 ∧  b^{11, 60}_0 ∧ true) 
c  in CNF:
c     b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ false 
c  in DIMACS:
 11564 -11565 -11566  0
c  -3 does not represent an automaton state.
c    -( b^{11, 60}_2 ∧  b^{11, 60}_1 ∧  b^{11, 60}_0 ∧ true) 
c  in CNF:
c    -b^{11, 60}_2 ∨ -b^{11, 60}_1 ∨ -b^{11, 60}_0 ∨ false 
c  in DIMACS:
-11564 -11565 -11566  0

c i = 61
c  -2+1 --> -1
c    ( b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧  p_671) -> ( b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0)
c  in CNF:
c    -b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨  b^{11, 62}_2
c    -b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_1
c    -b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨  b^{11, 62}_0
c  in DIMACS:
-11567 -11568  11569 -671  11570 0
-11567 -11568  11569 -671 -11571 0
-11567 -11568  11569 -671  11572 0

c  -1+1 --> 0
c    ( b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0 ∧  p_671) -> (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧ -b^{11, 62}_0)
c  in CNF:
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_2
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_1
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_0
c  in DIMACS:
-11567  11568 -11569 -671 -11570 0
-11567  11568 -11569 -671 -11571 0
-11567  11568 -11569 -671 -11572 0

c  0+1 --> 1
c    (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧  p_671) -> (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0)
c  in CNF:
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_2
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_1
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨  b^{11, 62}_0
c  in DIMACS:
 11567  11568  11569 -671 -11570 0
 11567  11568  11569 -671 -11571 0
 11567  11568  11569 -671  11572 0

c  1+1 --> 2
c    (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0 ∧  p_671) -> (-b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0)
c  in CNF:
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_2
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨  b^{11, 62}_1
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ -p_671 ∨ -b^{11, 62}_0
c  in DIMACS:
 11567  11568 -11569 -671 -11570 0
 11567  11568 -11569 -671  11571 0
 11567  11568 -11569 -671 -11572 0

c  2+1 --> break 
c    (-b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧  p_671) -> break
c  in CNF:
c     b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ -p_671 ∨ break
c  in DIMACS:
 11567 -11568  11569 -671 1162 0


c  2-1 --> 1
c    (-b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧ -p_671) -> (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0)
c  in CNF:
c     b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_2
c     b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_1
c     b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨  b^{11, 62}_0
c  in DIMACS:
 11567 -11568  11569  671 -11570 0
 11567 -11568  11569  671 -11571 0
 11567 -11568  11569  671  11572 0

c  1-1 --> 0
c    (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0 ∧ -p_671) -> (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧ -b^{11, 62}_0)
c  in CNF:
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_2
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_1
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_0
c  in DIMACS:
 11567  11568 -11569  671 -11570 0
 11567  11568 -11569  671 -11571 0
 11567  11568 -11569  671 -11572 0

c  0-1 --> -1
c    (-b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧ -p_671) -> ( b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0)
c  in CNF:
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨  b^{11, 62}_2
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_1
c     b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨  b^{11, 62}_0
c  in DIMACS:
 11567  11568  11569  671  11570 0
 11567  11568  11569  671 -11571 0
 11567  11568  11569  671  11572 0

c  -1-1 --> -2
c    ( b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧  b^{11, 61}_0 ∧ -p_671) -> ( b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0)
c  in CNF:
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨  b^{11, 62}_2
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨  b^{11, 62}_1
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨  p_671 ∨ -b^{11, 62}_0
c  in DIMACS:
-11567  11568 -11569  671  11570 0
-11567  11568 -11569  671  11571 0
-11567  11568 -11569  671 -11572 0

c  -2-1 --> break 
c    ( b^{11, 61}_2 ∧  b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧ -p_671) -> break
c  in CNF:
c    -b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨  b^{11, 61}_0 ∨  p_671 ∨ break
c  in DIMACS:
-11567 -11568  11569  671 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 61}_2 ∧ -b^{11, 61}_1 ∧ -b^{11, 61}_0 ∧ true) 
c  in CNF:
c    -b^{11, 61}_2 ∨  b^{11, 61}_1 ∨  b^{11, 61}_0 ∨ false 
c  in DIMACS:
-11567  11568  11569  0

c  3 does not represent an automaton state.
c    -(-b^{11, 61}_2 ∧  b^{11, 61}_1 ∧  b^{11, 61}_0 ∧ true) 
c  in CNF:
c     b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ false 
c  in DIMACS:
 11567 -11568 -11569  0
c  -3 does not represent an automaton state.
c    -( b^{11, 61}_2 ∧  b^{11, 61}_1 ∧  b^{11, 61}_0 ∧ true) 
c  in CNF:
c    -b^{11, 61}_2 ∨ -b^{11, 61}_1 ∨ -b^{11, 61}_0 ∨ false 
c  in DIMACS:
-11567 -11568 -11569  0

c i = 62
c  -2+1 --> -1
c    ( b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧  p_682) -> ( b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0)
c  in CNF:
c    -b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨  b^{11, 63}_2
c    -b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_1
c    -b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨  b^{11, 63}_0
c  in DIMACS:
-11570 -11571  11572 -682  11573 0
-11570 -11571  11572 -682 -11574 0
-11570 -11571  11572 -682  11575 0

c  -1+1 --> 0
c    ( b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0 ∧  p_682) -> (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧ -b^{11, 63}_0)
c  in CNF:
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_2
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_1
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_0
c  in DIMACS:
-11570  11571 -11572 -682 -11573 0
-11570  11571 -11572 -682 -11574 0
-11570  11571 -11572 -682 -11575 0

c  0+1 --> 1
c    (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧  p_682) -> (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0)
c  in CNF:
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_2
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_1
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨  b^{11, 63}_0
c  in DIMACS:
 11570  11571  11572 -682 -11573 0
 11570  11571  11572 -682 -11574 0
 11570  11571  11572 -682  11575 0

c  1+1 --> 2
c    (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0 ∧  p_682) -> (-b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0)
c  in CNF:
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_2
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨  b^{11, 63}_1
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ -p_682 ∨ -b^{11, 63}_0
c  in DIMACS:
 11570  11571 -11572 -682 -11573 0
 11570  11571 -11572 -682  11574 0
 11570  11571 -11572 -682 -11575 0

c  2+1 --> break 
c    (-b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧  p_682) -> break
c  in CNF:
c     b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 11570 -11571  11572 -682 1162 0


c  2-1 --> 1
c    (-b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧ -p_682) -> (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0)
c  in CNF:
c     b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_2
c     b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_1
c     b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨  b^{11, 63}_0
c  in DIMACS:
 11570 -11571  11572  682 -11573 0
 11570 -11571  11572  682 -11574 0
 11570 -11571  11572  682  11575 0

c  1-1 --> 0
c    (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0 ∧ -p_682) -> (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧ -b^{11, 63}_0)
c  in CNF:
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_2
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_1
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_0
c  in DIMACS:
 11570  11571 -11572  682 -11573 0
 11570  11571 -11572  682 -11574 0
 11570  11571 -11572  682 -11575 0

c  0-1 --> -1
c    (-b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧ -p_682) -> ( b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0)
c  in CNF:
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨  b^{11, 63}_2
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_1
c     b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨  b^{11, 63}_0
c  in DIMACS:
 11570  11571  11572  682  11573 0
 11570  11571  11572  682 -11574 0
 11570  11571  11572  682  11575 0

c  -1-1 --> -2
c    ( b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧  b^{11, 62}_0 ∧ -p_682) -> ( b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0)
c  in CNF:
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨  b^{11, 63}_2
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨  b^{11, 63}_1
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨  p_682 ∨ -b^{11, 63}_0
c  in DIMACS:
-11570  11571 -11572  682  11573 0
-11570  11571 -11572  682  11574 0
-11570  11571 -11572  682 -11575 0

c  -2-1 --> break 
c    ( b^{11, 62}_2 ∧  b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨  b^{11, 62}_0 ∨  p_682 ∨ break
c  in DIMACS:
-11570 -11571  11572  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 62}_2 ∧ -b^{11, 62}_1 ∧ -b^{11, 62}_0 ∧ true) 
c  in CNF:
c    -b^{11, 62}_2 ∨  b^{11, 62}_1 ∨  b^{11, 62}_0 ∨ false 
c  in DIMACS:
-11570  11571  11572  0

c  3 does not represent an automaton state.
c    -(-b^{11, 62}_2 ∧  b^{11, 62}_1 ∧  b^{11, 62}_0 ∧ true) 
c  in CNF:
c     b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ false 
c  in DIMACS:
 11570 -11571 -11572  0
c  -3 does not represent an automaton state.
c    -( b^{11, 62}_2 ∧  b^{11, 62}_1 ∧  b^{11, 62}_0 ∧ true) 
c  in CNF:
c    -b^{11, 62}_2 ∨ -b^{11, 62}_1 ∨ -b^{11, 62}_0 ∨ false 
c  in DIMACS:
-11570 -11571 -11572  0

c i = 63
c  -2+1 --> -1
c    ( b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧  p_693) -> ( b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0)
c  in CNF:
c    -b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨  b^{11, 64}_2
c    -b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_1
c    -b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨  b^{11, 64}_0
c  in DIMACS:
-11573 -11574  11575 -693  11576 0
-11573 -11574  11575 -693 -11577 0
-11573 -11574  11575 -693  11578 0

c  -1+1 --> 0
c    ( b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0 ∧  p_693) -> (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧ -b^{11, 64}_0)
c  in CNF:
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_2
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_1
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_0
c  in DIMACS:
-11573  11574 -11575 -693 -11576 0
-11573  11574 -11575 -693 -11577 0
-11573  11574 -11575 -693 -11578 0

c  0+1 --> 1
c    (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧  p_693) -> (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0)
c  in CNF:
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_2
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_1
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨  b^{11, 64}_0
c  in DIMACS:
 11573  11574  11575 -693 -11576 0
 11573  11574  11575 -693 -11577 0
 11573  11574  11575 -693  11578 0

c  1+1 --> 2
c    (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0 ∧  p_693) -> (-b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0)
c  in CNF:
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_2
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨  b^{11, 64}_1
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ -p_693 ∨ -b^{11, 64}_0
c  in DIMACS:
 11573  11574 -11575 -693 -11576 0
 11573  11574 -11575 -693  11577 0
 11573  11574 -11575 -693 -11578 0

c  2+1 --> break 
c    (-b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧  p_693) -> break
c  in CNF:
c     b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 11573 -11574  11575 -693 1162 0


c  2-1 --> 1
c    (-b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧ -p_693) -> (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0)
c  in CNF:
c     b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_2
c     b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_1
c     b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨  b^{11, 64}_0
c  in DIMACS:
 11573 -11574  11575  693 -11576 0
 11573 -11574  11575  693 -11577 0
 11573 -11574  11575  693  11578 0

c  1-1 --> 0
c    (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0 ∧ -p_693) -> (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧ -b^{11, 64}_0)
c  in CNF:
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_2
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_1
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_0
c  in DIMACS:
 11573  11574 -11575  693 -11576 0
 11573  11574 -11575  693 -11577 0
 11573  11574 -11575  693 -11578 0

c  0-1 --> -1
c    (-b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧ -p_693) -> ( b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0)
c  in CNF:
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨  b^{11, 64}_2
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_1
c     b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨  b^{11, 64}_0
c  in DIMACS:
 11573  11574  11575  693  11576 0
 11573  11574  11575  693 -11577 0
 11573  11574  11575  693  11578 0

c  -1-1 --> -2
c    ( b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧  b^{11, 63}_0 ∧ -p_693) -> ( b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0)
c  in CNF:
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨  b^{11, 64}_2
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨  b^{11, 64}_1
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨  p_693 ∨ -b^{11, 64}_0
c  in DIMACS:
-11573  11574 -11575  693  11576 0
-11573  11574 -11575  693  11577 0
-11573  11574 -11575  693 -11578 0

c  -2-1 --> break 
c    ( b^{11, 63}_2 ∧  b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨  b^{11, 63}_0 ∨  p_693 ∨ break
c  in DIMACS:
-11573 -11574  11575  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 63}_2 ∧ -b^{11, 63}_1 ∧ -b^{11, 63}_0 ∧ true) 
c  in CNF:
c    -b^{11, 63}_2 ∨  b^{11, 63}_1 ∨  b^{11, 63}_0 ∨ false 
c  in DIMACS:
-11573  11574  11575  0

c  3 does not represent an automaton state.
c    -(-b^{11, 63}_2 ∧  b^{11, 63}_1 ∧  b^{11, 63}_0 ∧ true) 
c  in CNF:
c     b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ false 
c  in DIMACS:
 11573 -11574 -11575  0
c  -3 does not represent an automaton state.
c    -( b^{11, 63}_2 ∧  b^{11, 63}_1 ∧  b^{11, 63}_0 ∧ true) 
c  in CNF:
c    -b^{11, 63}_2 ∨ -b^{11, 63}_1 ∨ -b^{11, 63}_0 ∨ false 
c  in DIMACS:
-11573 -11574 -11575  0

c i = 64
c  -2+1 --> -1
c    ( b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧  p_704) -> ( b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0)
c  in CNF:
c    -b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨  b^{11, 65}_2
c    -b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_1
c    -b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨  b^{11, 65}_0
c  in DIMACS:
-11576 -11577  11578 -704  11579 0
-11576 -11577  11578 -704 -11580 0
-11576 -11577  11578 -704  11581 0

c  -1+1 --> 0
c    ( b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0 ∧  p_704) -> (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧ -b^{11, 65}_0)
c  in CNF:
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_2
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_1
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_0
c  in DIMACS:
-11576  11577 -11578 -704 -11579 0
-11576  11577 -11578 -704 -11580 0
-11576  11577 -11578 -704 -11581 0

c  0+1 --> 1
c    (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧  p_704) -> (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0)
c  in CNF:
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_2
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_1
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨  b^{11, 65}_0
c  in DIMACS:
 11576  11577  11578 -704 -11579 0
 11576  11577  11578 -704 -11580 0
 11576  11577  11578 -704  11581 0

c  1+1 --> 2
c    (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0 ∧  p_704) -> (-b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0)
c  in CNF:
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_2
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨  b^{11, 65}_1
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ -p_704 ∨ -b^{11, 65}_0
c  in DIMACS:
 11576  11577 -11578 -704 -11579 0
 11576  11577 -11578 -704  11580 0
 11576  11577 -11578 -704 -11581 0

c  2+1 --> break 
c    (-b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧  p_704) -> break
c  in CNF:
c     b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 11576 -11577  11578 -704 1162 0


c  2-1 --> 1
c    (-b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧ -p_704) -> (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0)
c  in CNF:
c     b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_2
c     b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_1
c     b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨  b^{11, 65}_0
c  in DIMACS:
 11576 -11577  11578  704 -11579 0
 11576 -11577  11578  704 -11580 0
 11576 -11577  11578  704  11581 0

c  1-1 --> 0
c    (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0 ∧ -p_704) -> (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧ -b^{11, 65}_0)
c  in CNF:
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_2
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_1
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_0
c  in DIMACS:
 11576  11577 -11578  704 -11579 0
 11576  11577 -11578  704 -11580 0
 11576  11577 -11578  704 -11581 0

c  0-1 --> -1
c    (-b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧ -p_704) -> ( b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0)
c  in CNF:
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨  b^{11, 65}_2
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_1
c     b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨  b^{11, 65}_0
c  in DIMACS:
 11576  11577  11578  704  11579 0
 11576  11577  11578  704 -11580 0
 11576  11577  11578  704  11581 0

c  -1-1 --> -2
c    ( b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧  b^{11, 64}_0 ∧ -p_704) -> ( b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0)
c  in CNF:
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨  b^{11, 65}_2
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨  b^{11, 65}_1
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨  p_704 ∨ -b^{11, 65}_0
c  in DIMACS:
-11576  11577 -11578  704  11579 0
-11576  11577 -11578  704  11580 0
-11576  11577 -11578  704 -11581 0

c  -2-1 --> break 
c    ( b^{11, 64}_2 ∧  b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨  b^{11, 64}_0 ∨  p_704 ∨ break
c  in DIMACS:
-11576 -11577  11578  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 64}_2 ∧ -b^{11, 64}_1 ∧ -b^{11, 64}_0 ∧ true) 
c  in CNF:
c    -b^{11, 64}_2 ∨  b^{11, 64}_1 ∨  b^{11, 64}_0 ∨ false 
c  in DIMACS:
-11576  11577  11578  0

c  3 does not represent an automaton state.
c    -(-b^{11, 64}_2 ∧  b^{11, 64}_1 ∧  b^{11, 64}_0 ∧ true) 
c  in CNF:
c     b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ false 
c  in DIMACS:
 11576 -11577 -11578  0
c  -3 does not represent an automaton state.
c    -( b^{11, 64}_2 ∧  b^{11, 64}_1 ∧  b^{11, 64}_0 ∧ true) 
c  in CNF:
c    -b^{11, 64}_2 ∨ -b^{11, 64}_1 ∨ -b^{11, 64}_0 ∨ false 
c  in DIMACS:
-11576 -11577 -11578  0

c i = 65
c  -2+1 --> -1
c    ( b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧  p_715) -> ( b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0)
c  in CNF:
c    -b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨  b^{11, 66}_2
c    -b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_1
c    -b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨  b^{11, 66}_0
c  in DIMACS:
-11579 -11580  11581 -715  11582 0
-11579 -11580  11581 -715 -11583 0
-11579 -11580  11581 -715  11584 0

c  -1+1 --> 0
c    ( b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0 ∧  p_715) -> (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧ -b^{11, 66}_0)
c  in CNF:
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_2
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_1
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_0
c  in DIMACS:
-11579  11580 -11581 -715 -11582 0
-11579  11580 -11581 -715 -11583 0
-11579  11580 -11581 -715 -11584 0

c  0+1 --> 1
c    (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧  p_715) -> (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0)
c  in CNF:
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_2
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_1
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨  b^{11, 66}_0
c  in DIMACS:
 11579  11580  11581 -715 -11582 0
 11579  11580  11581 -715 -11583 0
 11579  11580  11581 -715  11584 0

c  1+1 --> 2
c    (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0 ∧  p_715) -> (-b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0)
c  in CNF:
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_2
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨  b^{11, 66}_1
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ -p_715 ∨ -b^{11, 66}_0
c  in DIMACS:
 11579  11580 -11581 -715 -11582 0
 11579  11580 -11581 -715  11583 0
 11579  11580 -11581 -715 -11584 0

c  2+1 --> break 
c    (-b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧  p_715) -> break
c  in CNF:
c     b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 11579 -11580  11581 -715 1162 0


c  2-1 --> 1
c    (-b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧ -p_715) -> (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0)
c  in CNF:
c     b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_2
c     b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_1
c     b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨  b^{11, 66}_0
c  in DIMACS:
 11579 -11580  11581  715 -11582 0
 11579 -11580  11581  715 -11583 0
 11579 -11580  11581  715  11584 0

c  1-1 --> 0
c    (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0 ∧ -p_715) -> (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧ -b^{11, 66}_0)
c  in CNF:
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_2
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_1
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_0
c  in DIMACS:
 11579  11580 -11581  715 -11582 0
 11579  11580 -11581  715 -11583 0
 11579  11580 -11581  715 -11584 0

c  0-1 --> -1
c    (-b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧ -p_715) -> ( b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0)
c  in CNF:
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨  b^{11, 66}_2
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_1
c     b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨  b^{11, 66}_0
c  in DIMACS:
 11579  11580  11581  715  11582 0
 11579  11580  11581  715 -11583 0
 11579  11580  11581  715  11584 0

c  -1-1 --> -2
c    ( b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧  b^{11, 65}_0 ∧ -p_715) -> ( b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0)
c  in CNF:
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨  b^{11, 66}_2
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨  b^{11, 66}_1
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨  p_715 ∨ -b^{11, 66}_0
c  in DIMACS:
-11579  11580 -11581  715  11582 0
-11579  11580 -11581  715  11583 0
-11579  11580 -11581  715 -11584 0

c  -2-1 --> break 
c    ( b^{11, 65}_2 ∧  b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨  b^{11, 65}_0 ∨  p_715 ∨ break
c  in DIMACS:
-11579 -11580  11581  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 65}_2 ∧ -b^{11, 65}_1 ∧ -b^{11, 65}_0 ∧ true) 
c  in CNF:
c    -b^{11, 65}_2 ∨  b^{11, 65}_1 ∨  b^{11, 65}_0 ∨ false 
c  in DIMACS:
-11579  11580  11581  0

c  3 does not represent an automaton state.
c    -(-b^{11, 65}_2 ∧  b^{11, 65}_1 ∧  b^{11, 65}_0 ∧ true) 
c  in CNF:
c     b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ false 
c  in DIMACS:
 11579 -11580 -11581  0
c  -3 does not represent an automaton state.
c    -( b^{11, 65}_2 ∧  b^{11, 65}_1 ∧  b^{11, 65}_0 ∧ true) 
c  in CNF:
c    -b^{11, 65}_2 ∨ -b^{11, 65}_1 ∨ -b^{11, 65}_0 ∨ false 
c  in DIMACS:
-11579 -11580 -11581  0

c i = 66
c  -2+1 --> -1
c    ( b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧  p_726) -> ( b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0)
c  in CNF:
c    -b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨  b^{11, 67}_2
c    -b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_1
c    -b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨  b^{11, 67}_0
c  in DIMACS:
-11582 -11583  11584 -726  11585 0
-11582 -11583  11584 -726 -11586 0
-11582 -11583  11584 -726  11587 0

c  -1+1 --> 0
c    ( b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0 ∧  p_726) -> (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧ -b^{11, 67}_0)
c  in CNF:
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_2
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_1
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_0
c  in DIMACS:
-11582  11583 -11584 -726 -11585 0
-11582  11583 -11584 -726 -11586 0
-11582  11583 -11584 -726 -11587 0

c  0+1 --> 1
c    (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧  p_726) -> (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0)
c  in CNF:
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_2
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_1
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨  b^{11, 67}_0
c  in DIMACS:
 11582  11583  11584 -726 -11585 0
 11582  11583  11584 -726 -11586 0
 11582  11583  11584 -726  11587 0

c  1+1 --> 2
c    (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0 ∧  p_726) -> (-b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0)
c  in CNF:
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_2
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨  b^{11, 67}_1
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ -p_726 ∨ -b^{11, 67}_0
c  in DIMACS:
 11582  11583 -11584 -726 -11585 0
 11582  11583 -11584 -726  11586 0
 11582  11583 -11584 -726 -11587 0

c  2+1 --> break 
c    (-b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧  p_726) -> break
c  in CNF:
c     b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 11582 -11583  11584 -726 1162 0


c  2-1 --> 1
c    (-b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧ -p_726) -> (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0)
c  in CNF:
c     b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_2
c     b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_1
c     b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨  b^{11, 67}_0
c  in DIMACS:
 11582 -11583  11584  726 -11585 0
 11582 -11583  11584  726 -11586 0
 11582 -11583  11584  726  11587 0

c  1-1 --> 0
c    (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0 ∧ -p_726) -> (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧ -b^{11, 67}_0)
c  in CNF:
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_2
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_1
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_0
c  in DIMACS:
 11582  11583 -11584  726 -11585 0
 11582  11583 -11584  726 -11586 0
 11582  11583 -11584  726 -11587 0

c  0-1 --> -1
c    (-b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧ -p_726) -> ( b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0)
c  in CNF:
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨  b^{11, 67}_2
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_1
c     b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨  b^{11, 67}_0
c  in DIMACS:
 11582  11583  11584  726  11585 0
 11582  11583  11584  726 -11586 0
 11582  11583  11584  726  11587 0

c  -1-1 --> -2
c    ( b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧  b^{11, 66}_0 ∧ -p_726) -> ( b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0)
c  in CNF:
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨  b^{11, 67}_2
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨  b^{11, 67}_1
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨  p_726 ∨ -b^{11, 67}_0
c  in DIMACS:
-11582  11583 -11584  726  11585 0
-11582  11583 -11584  726  11586 0
-11582  11583 -11584  726 -11587 0

c  -2-1 --> break 
c    ( b^{11, 66}_2 ∧  b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨  b^{11, 66}_0 ∨  p_726 ∨ break
c  in DIMACS:
-11582 -11583  11584  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 66}_2 ∧ -b^{11, 66}_1 ∧ -b^{11, 66}_0 ∧ true) 
c  in CNF:
c    -b^{11, 66}_2 ∨  b^{11, 66}_1 ∨  b^{11, 66}_0 ∨ false 
c  in DIMACS:
-11582  11583  11584  0

c  3 does not represent an automaton state.
c    -(-b^{11, 66}_2 ∧  b^{11, 66}_1 ∧  b^{11, 66}_0 ∧ true) 
c  in CNF:
c     b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ false 
c  in DIMACS:
 11582 -11583 -11584  0
c  -3 does not represent an automaton state.
c    -( b^{11, 66}_2 ∧  b^{11, 66}_1 ∧  b^{11, 66}_0 ∧ true) 
c  in CNF:
c    -b^{11, 66}_2 ∨ -b^{11, 66}_1 ∨ -b^{11, 66}_0 ∨ false 
c  in DIMACS:
-11582 -11583 -11584  0

c i = 67
c  -2+1 --> -1
c    ( b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧  p_737) -> ( b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0)
c  in CNF:
c    -b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨  b^{11, 68}_2
c    -b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_1
c    -b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨  b^{11, 68}_0
c  in DIMACS:
-11585 -11586  11587 -737  11588 0
-11585 -11586  11587 -737 -11589 0
-11585 -11586  11587 -737  11590 0

c  -1+1 --> 0
c    ( b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0 ∧  p_737) -> (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧ -b^{11, 68}_0)
c  in CNF:
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_2
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_1
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_0
c  in DIMACS:
-11585  11586 -11587 -737 -11588 0
-11585  11586 -11587 -737 -11589 0
-11585  11586 -11587 -737 -11590 0

c  0+1 --> 1
c    (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧  p_737) -> (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0)
c  in CNF:
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_2
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_1
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨  b^{11, 68}_0
c  in DIMACS:
 11585  11586  11587 -737 -11588 0
 11585  11586  11587 -737 -11589 0
 11585  11586  11587 -737  11590 0

c  1+1 --> 2
c    (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0 ∧  p_737) -> (-b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0)
c  in CNF:
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_2
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨  b^{11, 68}_1
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ -p_737 ∨ -b^{11, 68}_0
c  in DIMACS:
 11585  11586 -11587 -737 -11588 0
 11585  11586 -11587 -737  11589 0
 11585  11586 -11587 -737 -11590 0

c  2+1 --> break 
c    (-b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧  p_737) -> break
c  in CNF:
c     b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ -p_737 ∨ break
c  in DIMACS:
 11585 -11586  11587 -737 1162 0


c  2-1 --> 1
c    (-b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧ -p_737) -> (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0)
c  in CNF:
c     b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_2
c     b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_1
c     b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨  b^{11, 68}_0
c  in DIMACS:
 11585 -11586  11587  737 -11588 0
 11585 -11586  11587  737 -11589 0
 11585 -11586  11587  737  11590 0

c  1-1 --> 0
c    (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0 ∧ -p_737) -> (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧ -b^{11, 68}_0)
c  in CNF:
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_2
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_1
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_0
c  in DIMACS:
 11585  11586 -11587  737 -11588 0
 11585  11586 -11587  737 -11589 0
 11585  11586 -11587  737 -11590 0

c  0-1 --> -1
c    (-b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧ -p_737) -> ( b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0)
c  in CNF:
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨  b^{11, 68}_2
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_1
c     b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨  b^{11, 68}_0
c  in DIMACS:
 11585  11586  11587  737  11588 0
 11585  11586  11587  737 -11589 0
 11585  11586  11587  737  11590 0

c  -1-1 --> -2
c    ( b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧  b^{11, 67}_0 ∧ -p_737) -> ( b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0)
c  in CNF:
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨  b^{11, 68}_2
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨  b^{11, 68}_1
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨  p_737 ∨ -b^{11, 68}_0
c  in DIMACS:
-11585  11586 -11587  737  11588 0
-11585  11586 -11587  737  11589 0
-11585  11586 -11587  737 -11590 0

c  -2-1 --> break 
c    ( b^{11, 67}_2 ∧  b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧ -p_737) -> break
c  in CNF:
c    -b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨  b^{11, 67}_0 ∨  p_737 ∨ break
c  in DIMACS:
-11585 -11586  11587  737 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 67}_2 ∧ -b^{11, 67}_1 ∧ -b^{11, 67}_0 ∧ true) 
c  in CNF:
c    -b^{11, 67}_2 ∨  b^{11, 67}_1 ∨  b^{11, 67}_0 ∨ false 
c  in DIMACS:
-11585  11586  11587  0

c  3 does not represent an automaton state.
c    -(-b^{11, 67}_2 ∧  b^{11, 67}_1 ∧  b^{11, 67}_0 ∧ true) 
c  in CNF:
c     b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ false 
c  in DIMACS:
 11585 -11586 -11587  0
c  -3 does not represent an automaton state.
c    -( b^{11, 67}_2 ∧  b^{11, 67}_1 ∧  b^{11, 67}_0 ∧ true) 
c  in CNF:
c    -b^{11, 67}_2 ∨ -b^{11, 67}_1 ∨ -b^{11, 67}_0 ∨ false 
c  in DIMACS:
-11585 -11586 -11587  0

c i = 68
c  -2+1 --> -1
c    ( b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧  p_748) -> ( b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0)
c  in CNF:
c    -b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨  b^{11, 69}_2
c    -b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_1
c    -b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨  b^{11, 69}_0
c  in DIMACS:
-11588 -11589  11590 -748  11591 0
-11588 -11589  11590 -748 -11592 0
-11588 -11589  11590 -748  11593 0

c  -1+1 --> 0
c    ( b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0 ∧  p_748) -> (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧ -b^{11, 69}_0)
c  in CNF:
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_2
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_1
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_0
c  in DIMACS:
-11588  11589 -11590 -748 -11591 0
-11588  11589 -11590 -748 -11592 0
-11588  11589 -11590 -748 -11593 0

c  0+1 --> 1
c    (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧  p_748) -> (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0)
c  in CNF:
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_2
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_1
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨  b^{11, 69}_0
c  in DIMACS:
 11588  11589  11590 -748 -11591 0
 11588  11589  11590 -748 -11592 0
 11588  11589  11590 -748  11593 0

c  1+1 --> 2
c    (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0 ∧  p_748) -> (-b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0)
c  in CNF:
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_2
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨  b^{11, 69}_1
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ -p_748 ∨ -b^{11, 69}_0
c  in DIMACS:
 11588  11589 -11590 -748 -11591 0
 11588  11589 -11590 -748  11592 0
 11588  11589 -11590 -748 -11593 0

c  2+1 --> break 
c    (-b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧  p_748) -> break
c  in CNF:
c     b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 11588 -11589  11590 -748 1162 0


c  2-1 --> 1
c    (-b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧ -p_748) -> (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0)
c  in CNF:
c     b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_2
c     b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_1
c     b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨  b^{11, 69}_0
c  in DIMACS:
 11588 -11589  11590  748 -11591 0
 11588 -11589  11590  748 -11592 0
 11588 -11589  11590  748  11593 0

c  1-1 --> 0
c    (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0 ∧ -p_748) -> (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧ -b^{11, 69}_0)
c  in CNF:
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_2
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_1
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_0
c  in DIMACS:
 11588  11589 -11590  748 -11591 0
 11588  11589 -11590  748 -11592 0
 11588  11589 -11590  748 -11593 0

c  0-1 --> -1
c    (-b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧ -p_748) -> ( b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0)
c  in CNF:
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨  b^{11, 69}_2
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_1
c     b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨  b^{11, 69}_0
c  in DIMACS:
 11588  11589  11590  748  11591 0
 11588  11589  11590  748 -11592 0
 11588  11589  11590  748  11593 0

c  -1-1 --> -2
c    ( b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧  b^{11, 68}_0 ∧ -p_748) -> ( b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0)
c  in CNF:
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨  b^{11, 69}_2
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨  b^{11, 69}_1
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨  p_748 ∨ -b^{11, 69}_0
c  in DIMACS:
-11588  11589 -11590  748  11591 0
-11588  11589 -11590  748  11592 0
-11588  11589 -11590  748 -11593 0

c  -2-1 --> break 
c    ( b^{11, 68}_2 ∧  b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨  b^{11, 68}_0 ∨  p_748 ∨ break
c  in DIMACS:
-11588 -11589  11590  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 68}_2 ∧ -b^{11, 68}_1 ∧ -b^{11, 68}_0 ∧ true) 
c  in CNF:
c    -b^{11, 68}_2 ∨  b^{11, 68}_1 ∨  b^{11, 68}_0 ∨ false 
c  in DIMACS:
-11588  11589  11590  0

c  3 does not represent an automaton state.
c    -(-b^{11, 68}_2 ∧  b^{11, 68}_1 ∧  b^{11, 68}_0 ∧ true) 
c  in CNF:
c     b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ false 
c  in DIMACS:
 11588 -11589 -11590  0
c  -3 does not represent an automaton state.
c    -( b^{11, 68}_2 ∧  b^{11, 68}_1 ∧  b^{11, 68}_0 ∧ true) 
c  in CNF:
c    -b^{11, 68}_2 ∨ -b^{11, 68}_1 ∨ -b^{11, 68}_0 ∨ false 
c  in DIMACS:
-11588 -11589 -11590  0

c i = 69
c  -2+1 --> -1
c    ( b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧  p_759) -> ( b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0)
c  in CNF:
c    -b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨  b^{11, 70}_2
c    -b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_1
c    -b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨  b^{11, 70}_0
c  in DIMACS:
-11591 -11592  11593 -759  11594 0
-11591 -11592  11593 -759 -11595 0
-11591 -11592  11593 -759  11596 0

c  -1+1 --> 0
c    ( b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0 ∧  p_759) -> (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧ -b^{11, 70}_0)
c  in CNF:
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_2
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_1
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_0
c  in DIMACS:
-11591  11592 -11593 -759 -11594 0
-11591  11592 -11593 -759 -11595 0
-11591  11592 -11593 -759 -11596 0

c  0+1 --> 1
c    (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧  p_759) -> (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0)
c  in CNF:
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_2
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_1
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨  b^{11, 70}_0
c  in DIMACS:
 11591  11592  11593 -759 -11594 0
 11591  11592  11593 -759 -11595 0
 11591  11592  11593 -759  11596 0

c  1+1 --> 2
c    (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0 ∧  p_759) -> (-b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0)
c  in CNF:
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_2
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨  b^{11, 70}_1
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ -p_759 ∨ -b^{11, 70}_0
c  in DIMACS:
 11591  11592 -11593 -759 -11594 0
 11591  11592 -11593 -759  11595 0
 11591  11592 -11593 -759 -11596 0

c  2+1 --> break 
c    (-b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧  p_759) -> break
c  in CNF:
c     b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 11591 -11592  11593 -759 1162 0


c  2-1 --> 1
c    (-b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧ -p_759) -> (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0)
c  in CNF:
c     b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_2
c     b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_1
c     b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨  b^{11, 70}_0
c  in DIMACS:
 11591 -11592  11593  759 -11594 0
 11591 -11592  11593  759 -11595 0
 11591 -11592  11593  759  11596 0

c  1-1 --> 0
c    (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0 ∧ -p_759) -> (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧ -b^{11, 70}_0)
c  in CNF:
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_2
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_1
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_0
c  in DIMACS:
 11591  11592 -11593  759 -11594 0
 11591  11592 -11593  759 -11595 0
 11591  11592 -11593  759 -11596 0

c  0-1 --> -1
c    (-b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧ -p_759) -> ( b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0)
c  in CNF:
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨  b^{11, 70}_2
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_1
c     b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨  b^{11, 70}_0
c  in DIMACS:
 11591  11592  11593  759  11594 0
 11591  11592  11593  759 -11595 0
 11591  11592  11593  759  11596 0

c  -1-1 --> -2
c    ( b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧  b^{11, 69}_0 ∧ -p_759) -> ( b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0)
c  in CNF:
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨  b^{11, 70}_2
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨  b^{11, 70}_1
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨  p_759 ∨ -b^{11, 70}_0
c  in DIMACS:
-11591  11592 -11593  759  11594 0
-11591  11592 -11593  759  11595 0
-11591  11592 -11593  759 -11596 0

c  -2-1 --> break 
c    ( b^{11, 69}_2 ∧  b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨  b^{11, 69}_0 ∨  p_759 ∨ break
c  in DIMACS:
-11591 -11592  11593  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 69}_2 ∧ -b^{11, 69}_1 ∧ -b^{11, 69}_0 ∧ true) 
c  in CNF:
c    -b^{11, 69}_2 ∨  b^{11, 69}_1 ∨  b^{11, 69}_0 ∨ false 
c  in DIMACS:
-11591  11592  11593  0

c  3 does not represent an automaton state.
c    -(-b^{11, 69}_2 ∧  b^{11, 69}_1 ∧  b^{11, 69}_0 ∧ true) 
c  in CNF:
c     b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ false 
c  in DIMACS:
 11591 -11592 -11593  0
c  -3 does not represent an automaton state.
c    -( b^{11, 69}_2 ∧  b^{11, 69}_1 ∧  b^{11, 69}_0 ∧ true) 
c  in CNF:
c    -b^{11, 69}_2 ∨ -b^{11, 69}_1 ∨ -b^{11, 69}_0 ∨ false 
c  in DIMACS:
-11591 -11592 -11593  0

c i = 70
c  -2+1 --> -1
c    ( b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧  p_770) -> ( b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0)
c  in CNF:
c    -b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨  b^{11, 71}_2
c    -b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_1
c    -b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨  b^{11, 71}_0
c  in DIMACS:
-11594 -11595  11596 -770  11597 0
-11594 -11595  11596 -770 -11598 0
-11594 -11595  11596 -770  11599 0

c  -1+1 --> 0
c    ( b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0 ∧  p_770) -> (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧ -b^{11, 71}_0)
c  in CNF:
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_2
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_1
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_0
c  in DIMACS:
-11594  11595 -11596 -770 -11597 0
-11594  11595 -11596 -770 -11598 0
-11594  11595 -11596 -770 -11599 0

c  0+1 --> 1
c    (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧  p_770) -> (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0)
c  in CNF:
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_2
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_1
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨  b^{11, 71}_0
c  in DIMACS:
 11594  11595  11596 -770 -11597 0
 11594  11595  11596 -770 -11598 0
 11594  11595  11596 -770  11599 0

c  1+1 --> 2
c    (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0 ∧  p_770) -> (-b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0)
c  in CNF:
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_2
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨  b^{11, 71}_1
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ -p_770 ∨ -b^{11, 71}_0
c  in DIMACS:
 11594  11595 -11596 -770 -11597 0
 11594  11595 -11596 -770  11598 0
 11594  11595 -11596 -770 -11599 0

c  2+1 --> break 
c    (-b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧  p_770) -> break
c  in CNF:
c     b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 11594 -11595  11596 -770 1162 0


c  2-1 --> 1
c    (-b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧ -p_770) -> (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0)
c  in CNF:
c     b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_2
c     b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_1
c     b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨  b^{11, 71}_0
c  in DIMACS:
 11594 -11595  11596  770 -11597 0
 11594 -11595  11596  770 -11598 0
 11594 -11595  11596  770  11599 0

c  1-1 --> 0
c    (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0 ∧ -p_770) -> (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧ -b^{11, 71}_0)
c  in CNF:
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_2
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_1
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_0
c  in DIMACS:
 11594  11595 -11596  770 -11597 0
 11594  11595 -11596  770 -11598 0
 11594  11595 -11596  770 -11599 0

c  0-1 --> -1
c    (-b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧ -p_770) -> ( b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0)
c  in CNF:
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨  b^{11, 71}_2
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_1
c     b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨  b^{11, 71}_0
c  in DIMACS:
 11594  11595  11596  770  11597 0
 11594  11595  11596  770 -11598 0
 11594  11595  11596  770  11599 0

c  -1-1 --> -2
c    ( b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧  b^{11, 70}_0 ∧ -p_770) -> ( b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0)
c  in CNF:
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨  b^{11, 71}_2
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨  b^{11, 71}_1
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨  p_770 ∨ -b^{11, 71}_0
c  in DIMACS:
-11594  11595 -11596  770  11597 0
-11594  11595 -11596  770  11598 0
-11594  11595 -11596  770 -11599 0

c  -2-1 --> break 
c    ( b^{11, 70}_2 ∧  b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨  b^{11, 70}_0 ∨  p_770 ∨ break
c  in DIMACS:
-11594 -11595  11596  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 70}_2 ∧ -b^{11, 70}_1 ∧ -b^{11, 70}_0 ∧ true) 
c  in CNF:
c    -b^{11, 70}_2 ∨  b^{11, 70}_1 ∨  b^{11, 70}_0 ∨ false 
c  in DIMACS:
-11594  11595  11596  0

c  3 does not represent an automaton state.
c    -(-b^{11, 70}_2 ∧  b^{11, 70}_1 ∧  b^{11, 70}_0 ∧ true) 
c  in CNF:
c     b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ false 
c  in DIMACS:
 11594 -11595 -11596  0
c  -3 does not represent an automaton state.
c    -( b^{11, 70}_2 ∧  b^{11, 70}_1 ∧  b^{11, 70}_0 ∧ true) 
c  in CNF:
c    -b^{11, 70}_2 ∨ -b^{11, 70}_1 ∨ -b^{11, 70}_0 ∨ false 
c  in DIMACS:
-11594 -11595 -11596  0

c i = 71
c  -2+1 --> -1
c    ( b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧  p_781) -> ( b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0)
c  in CNF:
c    -b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨  b^{11, 72}_2
c    -b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_1
c    -b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨  b^{11, 72}_0
c  in DIMACS:
-11597 -11598  11599 -781  11600 0
-11597 -11598  11599 -781 -11601 0
-11597 -11598  11599 -781  11602 0

c  -1+1 --> 0
c    ( b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0 ∧  p_781) -> (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧ -b^{11, 72}_0)
c  in CNF:
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_2
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_1
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_0
c  in DIMACS:
-11597  11598 -11599 -781 -11600 0
-11597  11598 -11599 -781 -11601 0
-11597  11598 -11599 -781 -11602 0

c  0+1 --> 1
c    (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧  p_781) -> (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0)
c  in CNF:
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_2
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_1
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨  b^{11, 72}_0
c  in DIMACS:
 11597  11598  11599 -781 -11600 0
 11597  11598  11599 -781 -11601 0
 11597  11598  11599 -781  11602 0

c  1+1 --> 2
c    (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0 ∧  p_781) -> (-b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0)
c  in CNF:
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_2
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨  b^{11, 72}_1
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ -p_781 ∨ -b^{11, 72}_0
c  in DIMACS:
 11597  11598 -11599 -781 -11600 0
 11597  11598 -11599 -781  11601 0
 11597  11598 -11599 -781 -11602 0

c  2+1 --> break 
c    (-b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧  p_781) -> break
c  in CNF:
c     b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ -p_781 ∨ break
c  in DIMACS:
 11597 -11598  11599 -781 1162 0


c  2-1 --> 1
c    (-b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧ -p_781) -> (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0)
c  in CNF:
c     b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_2
c     b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_1
c     b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨  b^{11, 72}_0
c  in DIMACS:
 11597 -11598  11599  781 -11600 0
 11597 -11598  11599  781 -11601 0
 11597 -11598  11599  781  11602 0

c  1-1 --> 0
c    (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0 ∧ -p_781) -> (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧ -b^{11, 72}_0)
c  in CNF:
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_2
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_1
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_0
c  in DIMACS:
 11597  11598 -11599  781 -11600 0
 11597  11598 -11599  781 -11601 0
 11597  11598 -11599  781 -11602 0

c  0-1 --> -1
c    (-b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧ -p_781) -> ( b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0)
c  in CNF:
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨  b^{11, 72}_2
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_1
c     b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨  b^{11, 72}_0
c  in DIMACS:
 11597  11598  11599  781  11600 0
 11597  11598  11599  781 -11601 0
 11597  11598  11599  781  11602 0

c  -1-1 --> -2
c    ( b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧  b^{11, 71}_0 ∧ -p_781) -> ( b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0)
c  in CNF:
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨  b^{11, 72}_2
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨  b^{11, 72}_1
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨  p_781 ∨ -b^{11, 72}_0
c  in DIMACS:
-11597  11598 -11599  781  11600 0
-11597  11598 -11599  781  11601 0
-11597  11598 -11599  781 -11602 0

c  -2-1 --> break 
c    ( b^{11, 71}_2 ∧  b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧ -p_781) -> break
c  in CNF:
c    -b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨  b^{11, 71}_0 ∨  p_781 ∨ break
c  in DIMACS:
-11597 -11598  11599  781 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 71}_2 ∧ -b^{11, 71}_1 ∧ -b^{11, 71}_0 ∧ true) 
c  in CNF:
c    -b^{11, 71}_2 ∨  b^{11, 71}_1 ∨  b^{11, 71}_0 ∨ false 
c  in DIMACS:
-11597  11598  11599  0

c  3 does not represent an automaton state.
c    -(-b^{11, 71}_2 ∧  b^{11, 71}_1 ∧  b^{11, 71}_0 ∧ true) 
c  in CNF:
c     b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ false 
c  in DIMACS:
 11597 -11598 -11599  0
c  -3 does not represent an automaton state.
c    -( b^{11, 71}_2 ∧  b^{11, 71}_1 ∧  b^{11, 71}_0 ∧ true) 
c  in CNF:
c    -b^{11, 71}_2 ∨ -b^{11, 71}_1 ∨ -b^{11, 71}_0 ∨ false 
c  in DIMACS:
-11597 -11598 -11599  0

c i = 72
c  -2+1 --> -1
c    ( b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧  p_792) -> ( b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0)
c  in CNF:
c    -b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨  b^{11, 73}_2
c    -b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_1
c    -b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨  b^{11, 73}_0
c  in DIMACS:
-11600 -11601  11602 -792  11603 0
-11600 -11601  11602 -792 -11604 0
-11600 -11601  11602 -792  11605 0

c  -1+1 --> 0
c    ( b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0 ∧  p_792) -> (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧ -b^{11, 73}_0)
c  in CNF:
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_2
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_1
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_0
c  in DIMACS:
-11600  11601 -11602 -792 -11603 0
-11600  11601 -11602 -792 -11604 0
-11600  11601 -11602 -792 -11605 0

c  0+1 --> 1
c    (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧  p_792) -> (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0)
c  in CNF:
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_2
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_1
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨  b^{11, 73}_0
c  in DIMACS:
 11600  11601  11602 -792 -11603 0
 11600  11601  11602 -792 -11604 0
 11600  11601  11602 -792  11605 0

c  1+1 --> 2
c    (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0 ∧  p_792) -> (-b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0)
c  in CNF:
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_2
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨  b^{11, 73}_1
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ -p_792 ∨ -b^{11, 73}_0
c  in DIMACS:
 11600  11601 -11602 -792 -11603 0
 11600  11601 -11602 -792  11604 0
 11600  11601 -11602 -792 -11605 0

c  2+1 --> break 
c    (-b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧  p_792) -> break
c  in CNF:
c     b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 11600 -11601  11602 -792 1162 0


c  2-1 --> 1
c    (-b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧ -p_792) -> (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0)
c  in CNF:
c     b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_2
c     b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_1
c     b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨  b^{11, 73}_0
c  in DIMACS:
 11600 -11601  11602  792 -11603 0
 11600 -11601  11602  792 -11604 0
 11600 -11601  11602  792  11605 0

c  1-1 --> 0
c    (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0 ∧ -p_792) -> (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧ -b^{11, 73}_0)
c  in CNF:
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_2
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_1
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_0
c  in DIMACS:
 11600  11601 -11602  792 -11603 0
 11600  11601 -11602  792 -11604 0
 11600  11601 -11602  792 -11605 0

c  0-1 --> -1
c    (-b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧ -p_792) -> ( b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0)
c  in CNF:
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨  b^{11, 73}_2
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_1
c     b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨  b^{11, 73}_0
c  in DIMACS:
 11600  11601  11602  792  11603 0
 11600  11601  11602  792 -11604 0
 11600  11601  11602  792  11605 0

c  -1-1 --> -2
c    ( b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧  b^{11, 72}_0 ∧ -p_792) -> ( b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0)
c  in CNF:
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨  b^{11, 73}_2
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨  b^{11, 73}_1
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨  p_792 ∨ -b^{11, 73}_0
c  in DIMACS:
-11600  11601 -11602  792  11603 0
-11600  11601 -11602  792  11604 0
-11600  11601 -11602  792 -11605 0

c  -2-1 --> break 
c    ( b^{11, 72}_2 ∧  b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨  b^{11, 72}_0 ∨  p_792 ∨ break
c  in DIMACS:
-11600 -11601  11602  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 72}_2 ∧ -b^{11, 72}_1 ∧ -b^{11, 72}_0 ∧ true) 
c  in CNF:
c    -b^{11, 72}_2 ∨  b^{11, 72}_1 ∨  b^{11, 72}_0 ∨ false 
c  in DIMACS:
-11600  11601  11602  0

c  3 does not represent an automaton state.
c    -(-b^{11, 72}_2 ∧  b^{11, 72}_1 ∧  b^{11, 72}_0 ∧ true) 
c  in CNF:
c     b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ false 
c  in DIMACS:
 11600 -11601 -11602  0
c  -3 does not represent an automaton state.
c    -( b^{11, 72}_2 ∧  b^{11, 72}_1 ∧  b^{11, 72}_0 ∧ true) 
c  in CNF:
c    -b^{11, 72}_2 ∨ -b^{11, 72}_1 ∨ -b^{11, 72}_0 ∨ false 
c  in DIMACS:
-11600 -11601 -11602  0

c i = 73
c  -2+1 --> -1
c    ( b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧  p_803) -> ( b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0)
c  in CNF:
c    -b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨  b^{11, 74}_2
c    -b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_1
c    -b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨  b^{11, 74}_0
c  in DIMACS:
-11603 -11604  11605 -803  11606 0
-11603 -11604  11605 -803 -11607 0
-11603 -11604  11605 -803  11608 0

c  -1+1 --> 0
c    ( b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0 ∧  p_803) -> (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧ -b^{11, 74}_0)
c  in CNF:
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_2
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_1
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_0
c  in DIMACS:
-11603  11604 -11605 -803 -11606 0
-11603  11604 -11605 -803 -11607 0
-11603  11604 -11605 -803 -11608 0

c  0+1 --> 1
c    (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧  p_803) -> (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0)
c  in CNF:
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_2
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_1
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨  b^{11, 74}_0
c  in DIMACS:
 11603  11604  11605 -803 -11606 0
 11603  11604  11605 -803 -11607 0
 11603  11604  11605 -803  11608 0

c  1+1 --> 2
c    (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0 ∧  p_803) -> (-b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0)
c  in CNF:
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_2
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨  b^{11, 74}_1
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ -p_803 ∨ -b^{11, 74}_0
c  in DIMACS:
 11603  11604 -11605 -803 -11606 0
 11603  11604 -11605 -803  11607 0
 11603  11604 -11605 -803 -11608 0

c  2+1 --> break 
c    (-b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧  p_803) -> break
c  in CNF:
c     b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ -p_803 ∨ break
c  in DIMACS:
 11603 -11604  11605 -803 1162 0


c  2-1 --> 1
c    (-b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧ -p_803) -> (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0)
c  in CNF:
c     b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_2
c     b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_1
c     b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨  b^{11, 74}_0
c  in DIMACS:
 11603 -11604  11605  803 -11606 0
 11603 -11604  11605  803 -11607 0
 11603 -11604  11605  803  11608 0

c  1-1 --> 0
c    (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0 ∧ -p_803) -> (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧ -b^{11, 74}_0)
c  in CNF:
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_2
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_1
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_0
c  in DIMACS:
 11603  11604 -11605  803 -11606 0
 11603  11604 -11605  803 -11607 0
 11603  11604 -11605  803 -11608 0

c  0-1 --> -1
c    (-b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧ -p_803) -> ( b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0)
c  in CNF:
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨  b^{11, 74}_2
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_1
c     b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨  b^{11, 74}_0
c  in DIMACS:
 11603  11604  11605  803  11606 0
 11603  11604  11605  803 -11607 0
 11603  11604  11605  803  11608 0

c  -1-1 --> -2
c    ( b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧  b^{11, 73}_0 ∧ -p_803) -> ( b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0)
c  in CNF:
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨  b^{11, 74}_2
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨  b^{11, 74}_1
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨  p_803 ∨ -b^{11, 74}_0
c  in DIMACS:
-11603  11604 -11605  803  11606 0
-11603  11604 -11605  803  11607 0
-11603  11604 -11605  803 -11608 0

c  -2-1 --> break 
c    ( b^{11, 73}_2 ∧  b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧ -p_803) -> break
c  in CNF:
c    -b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨  b^{11, 73}_0 ∨  p_803 ∨ break
c  in DIMACS:
-11603 -11604  11605  803 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 73}_2 ∧ -b^{11, 73}_1 ∧ -b^{11, 73}_0 ∧ true) 
c  in CNF:
c    -b^{11, 73}_2 ∨  b^{11, 73}_1 ∨  b^{11, 73}_0 ∨ false 
c  in DIMACS:
-11603  11604  11605  0

c  3 does not represent an automaton state.
c    -(-b^{11, 73}_2 ∧  b^{11, 73}_1 ∧  b^{11, 73}_0 ∧ true) 
c  in CNF:
c     b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ false 
c  in DIMACS:
 11603 -11604 -11605  0
c  -3 does not represent an automaton state.
c    -( b^{11, 73}_2 ∧  b^{11, 73}_1 ∧  b^{11, 73}_0 ∧ true) 
c  in CNF:
c    -b^{11, 73}_2 ∨ -b^{11, 73}_1 ∨ -b^{11, 73}_0 ∨ false 
c  in DIMACS:
-11603 -11604 -11605  0

c i = 74
c  -2+1 --> -1
c    ( b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧  p_814) -> ( b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0)
c  in CNF:
c    -b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨  b^{11, 75}_2
c    -b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_1
c    -b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨  b^{11, 75}_0
c  in DIMACS:
-11606 -11607  11608 -814  11609 0
-11606 -11607  11608 -814 -11610 0
-11606 -11607  11608 -814  11611 0

c  -1+1 --> 0
c    ( b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0 ∧  p_814) -> (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧ -b^{11, 75}_0)
c  in CNF:
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_2
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_1
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_0
c  in DIMACS:
-11606  11607 -11608 -814 -11609 0
-11606  11607 -11608 -814 -11610 0
-11606  11607 -11608 -814 -11611 0

c  0+1 --> 1
c    (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧  p_814) -> (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0)
c  in CNF:
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_2
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_1
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨  b^{11, 75}_0
c  in DIMACS:
 11606  11607  11608 -814 -11609 0
 11606  11607  11608 -814 -11610 0
 11606  11607  11608 -814  11611 0

c  1+1 --> 2
c    (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0 ∧  p_814) -> (-b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0)
c  in CNF:
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_2
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨  b^{11, 75}_1
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ -p_814 ∨ -b^{11, 75}_0
c  in DIMACS:
 11606  11607 -11608 -814 -11609 0
 11606  11607 -11608 -814  11610 0
 11606  11607 -11608 -814 -11611 0

c  2+1 --> break 
c    (-b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧  p_814) -> break
c  in CNF:
c     b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 11606 -11607  11608 -814 1162 0


c  2-1 --> 1
c    (-b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧ -p_814) -> (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0)
c  in CNF:
c     b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_2
c     b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_1
c     b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨  b^{11, 75}_0
c  in DIMACS:
 11606 -11607  11608  814 -11609 0
 11606 -11607  11608  814 -11610 0
 11606 -11607  11608  814  11611 0

c  1-1 --> 0
c    (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0 ∧ -p_814) -> (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧ -b^{11, 75}_0)
c  in CNF:
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_2
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_1
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_0
c  in DIMACS:
 11606  11607 -11608  814 -11609 0
 11606  11607 -11608  814 -11610 0
 11606  11607 -11608  814 -11611 0

c  0-1 --> -1
c    (-b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧ -p_814) -> ( b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0)
c  in CNF:
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨  b^{11, 75}_2
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_1
c     b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨  b^{11, 75}_0
c  in DIMACS:
 11606  11607  11608  814  11609 0
 11606  11607  11608  814 -11610 0
 11606  11607  11608  814  11611 0

c  -1-1 --> -2
c    ( b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧  b^{11, 74}_0 ∧ -p_814) -> ( b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0)
c  in CNF:
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨  b^{11, 75}_2
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨  b^{11, 75}_1
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨  p_814 ∨ -b^{11, 75}_0
c  in DIMACS:
-11606  11607 -11608  814  11609 0
-11606  11607 -11608  814  11610 0
-11606  11607 -11608  814 -11611 0

c  -2-1 --> break 
c    ( b^{11, 74}_2 ∧  b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨  b^{11, 74}_0 ∨  p_814 ∨ break
c  in DIMACS:
-11606 -11607  11608  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 74}_2 ∧ -b^{11, 74}_1 ∧ -b^{11, 74}_0 ∧ true) 
c  in CNF:
c    -b^{11, 74}_2 ∨  b^{11, 74}_1 ∨  b^{11, 74}_0 ∨ false 
c  in DIMACS:
-11606  11607  11608  0

c  3 does not represent an automaton state.
c    -(-b^{11, 74}_2 ∧  b^{11, 74}_1 ∧  b^{11, 74}_0 ∧ true) 
c  in CNF:
c     b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ false 
c  in DIMACS:
 11606 -11607 -11608  0
c  -3 does not represent an automaton state.
c    -( b^{11, 74}_2 ∧  b^{11, 74}_1 ∧  b^{11, 74}_0 ∧ true) 
c  in CNF:
c    -b^{11, 74}_2 ∨ -b^{11, 74}_1 ∨ -b^{11, 74}_0 ∨ false 
c  in DIMACS:
-11606 -11607 -11608  0

c i = 75
c  -2+1 --> -1
c    ( b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧  p_825) -> ( b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0)
c  in CNF:
c    -b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨  b^{11, 76}_2
c    -b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_1
c    -b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨  b^{11, 76}_0
c  in DIMACS:
-11609 -11610  11611 -825  11612 0
-11609 -11610  11611 -825 -11613 0
-11609 -11610  11611 -825  11614 0

c  -1+1 --> 0
c    ( b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0 ∧  p_825) -> (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧ -b^{11, 76}_0)
c  in CNF:
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_2
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_1
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_0
c  in DIMACS:
-11609  11610 -11611 -825 -11612 0
-11609  11610 -11611 -825 -11613 0
-11609  11610 -11611 -825 -11614 0

c  0+1 --> 1
c    (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧  p_825) -> (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0)
c  in CNF:
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_2
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_1
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨  b^{11, 76}_0
c  in DIMACS:
 11609  11610  11611 -825 -11612 0
 11609  11610  11611 -825 -11613 0
 11609  11610  11611 -825  11614 0

c  1+1 --> 2
c    (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0 ∧  p_825) -> (-b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0)
c  in CNF:
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_2
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨  b^{11, 76}_1
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ -p_825 ∨ -b^{11, 76}_0
c  in DIMACS:
 11609  11610 -11611 -825 -11612 0
 11609  11610 -11611 -825  11613 0
 11609  11610 -11611 -825 -11614 0

c  2+1 --> break 
c    (-b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧  p_825) -> break
c  in CNF:
c     b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 11609 -11610  11611 -825 1162 0


c  2-1 --> 1
c    (-b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧ -p_825) -> (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0)
c  in CNF:
c     b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_2
c     b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_1
c     b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨  b^{11, 76}_0
c  in DIMACS:
 11609 -11610  11611  825 -11612 0
 11609 -11610  11611  825 -11613 0
 11609 -11610  11611  825  11614 0

c  1-1 --> 0
c    (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0 ∧ -p_825) -> (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧ -b^{11, 76}_0)
c  in CNF:
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_2
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_1
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_0
c  in DIMACS:
 11609  11610 -11611  825 -11612 0
 11609  11610 -11611  825 -11613 0
 11609  11610 -11611  825 -11614 0

c  0-1 --> -1
c    (-b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧ -p_825) -> ( b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0)
c  in CNF:
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨  b^{11, 76}_2
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_1
c     b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨  b^{11, 76}_0
c  in DIMACS:
 11609  11610  11611  825  11612 0
 11609  11610  11611  825 -11613 0
 11609  11610  11611  825  11614 0

c  -1-1 --> -2
c    ( b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧  b^{11, 75}_0 ∧ -p_825) -> ( b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0)
c  in CNF:
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨  b^{11, 76}_2
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨  b^{11, 76}_1
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨  p_825 ∨ -b^{11, 76}_0
c  in DIMACS:
-11609  11610 -11611  825  11612 0
-11609  11610 -11611  825  11613 0
-11609  11610 -11611  825 -11614 0

c  -2-1 --> break 
c    ( b^{11, 75}_2 ∧  b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨  b^{11, 75}_0 ∨  p_825 ∨ break
c  in DIMACS:
-11609 -11610  11611  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 75}_2 ∧ -b^{11, 75}_1 ∧ -b^{11, 75}_0 ∧ true) 
c  in CNF:
c    -b^{11, 75}_2 ∨  b^{11, 75}_1 ∨  b^{11, 75}_0 ∨ false 
c  in DIMACS:
-11609  11610  11611  0

c  3 does not represent an automaton state.
c    -(-b^{11, 75}_2 ∧  b^{11, 75}_1 ∧  b^{11, 75}_0 ∧ true) 
c  in CNF:
c     b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ false 
c  in DIMACS:
 11609 -11610 -11611  0
c  -3 does not represent an automaton state.
c    -( b^{11, 75}_2 ∧  b^{11, 75}_1 ∧  b^{11, 75}_0 ∧ true) 
c  in CNF:
c    -b^{11, 75}_2 ∨ -b^{11, 75}_1 ∨ -b^{11, 75}_0 ∨ false 
c  in DIMACS:
-11609 -11610 -11611  0

c i = 76
c  -2+1 --> -1
c    ( b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧  p_836) -> ( b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0)
c  in CNF:
c    -b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨  b^{11, 77}_2
c    -b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_1
c    -b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨  b^{11, 77}_0
c  in DIMACS:
-11612 -11613  11614 -836  11615 0
-11612 -11613  11614 -836 -11616 0
-11612 -11613  11614 -836  11617 0

c  -1+1 --> 0
c    ( b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0 ∧  p_836) -> (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧ -b^{11, 77}_0)
c  in CNF:
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_2
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_1
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_0
c  in DIMACS:
-11612  11613 -11614 -836 -11615 0
-11612  11613 -11614 -836 -11616 0
-11612  11613 -11614 -836 -11617 0

c  0+1 --> 1
c    (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧  p_836) -> (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0)
c  in CNF:
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_2
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_1
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨  b^{11, 77}_0
c  in DIMACS:
 11612  11613  11614 -836 -11615 0
 11612  11613  11614 -836 -11616 0
 11612  11613  11614 -836  11617 0

c  1+1 --> 2
c    (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0 ∧  p_836) -> (-b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0)
c  in CNF:
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_2
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨  b^{11, 77}_1
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ -p_836 ∨ -b^{11, 77}_0
c  in DIMACS:
 11612  11613 -11614 -836 -11615 0
 11612  11613 -11614 -836  11616 0
 11612  11613 -11614 -836 -11617 0

c  2+1 --> break 
c    (-b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧  p_836) -> break
c  in CNF:
c     b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 11612 -11613  11614 -836 1162 0


c  2-1 --> 1
c    (-b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧ -p_836) -> (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0)
c  in CNF:
c     b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_2
c     b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_1
c     b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨  b^{11, 77}_0
c  in DIMACS:
 11612 -11613  11614  836 -11615 0
 11612 -11613  11614  836 -11616 0
 11612 -11613  11614  836  11617 0

c  1-1 --> 0
c    (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0 ∧ -p_836) -> (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧ -b^{11, 77}_0)
c  in CNF:
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_2
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_1
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_0
c  in DIMACS:
 11612  11613 -11614  836 -11615 0
 11612  11613 -11614  836 -11616 0
 11612  11613 -11614  836 -11617 0

c  0-1 --> -1
c    (-b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧ -p_836) -> ( b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0)
c  in CNF:
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨  b^{11, 77}_2
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_1
c     b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨  b^{11, 77}_0
c  in DIMACS:
 11612  11613  11614  836  11615 0
 11612  11613  11614  836 -11616 0
 11612  11613  11614  836  11617 0

c  -1-1 --> -2
c    ( b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧  b^{11, 76}_0 ∧ -p_836) -> ( b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0)
c  in CNF:
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨  b^{11, 77}_2
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨  b^{11, 77}_1
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨  p_836 ∨ -b^{11, 77}_0
c  in DIMACS:
-11612  11613 -11614  836  11615 0
-11612  11613 -11614  836  11616 0
-11612  11613 -11614  836 -11617 0

c  -2-1 --> break 
c    ( b^{11, 76}_2 ∧  b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨  b^{11, 76}_0 ∨  p_836 ∨ break
c  in DIMACS:
-11612 -11613  11614  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 76}_2 ∧ -b^{11, 76}_1 ∧ -b^{11, 76}_0 ∧ true) 
c  in CNF:
c    -b^{11, 76}_2 ∨  b^{11, 76}_1 ∨  b^{11, 76}_0 ∨ false 
c  in DIMACS:
-11612  11613  11614  0

c  3 does not represent an automaton state.
c    -(-b^{11, 76}_2 ∧  b^{11, 76}_1 ∧  b^{11, 76}_0 ∧ true) 
c  in CNF:
c     b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ false 
c  in DIMACS:
 11612 -11613 -11614  0
c  -3 does not represent an automaton state.
c    -( b^{11, 76}_2 ∧  b^{11, 76}_1 ∧  b^{11, 76}_0 ∧ true) 
c  in CNF:
c    -b^{11, 76}_2 ∨ -b^{11, 76}_1 ∨ -b^{11, 76}_0 ∨ false 
c  in DIMACS:
-11612 -11613 -11614  0

c i = 77
c  -2+1 --> -1
c    ( b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧  p_847) -> ( b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0)
c  in CNF:
c    -b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨  b^{11, 78}_2
c    -b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_1
c    -b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨  b^{11, 78}_0
c  in DIMACS:
-11615 -11616  11617 -847  11618 0
-11615 -11616  11617 -847 -11619 0
-11615 -11616  11617 -847  11620 0

c  -1+1 --> 0
c    ( b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0 ∧  p_847) -> (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧ -b^{11, 78}_0)
c  in CNF:
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_2
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_1
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_0
c  in DIMACS:
-11615  11616 -11617 -847 -11618 0
-11615  11616 -11617 -847 -11619 0
-11615  11616 -11617 -847 -11620 0

c  0+1 --> 1
c    (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧  p_847) -> (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0)
c  in CNF:
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_2
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_1
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨  b^{11, 78}_0
c  in DIMACS:
 11615  11616  11617 -847 -11618 0
 11615  11616  11617 -847 -11619 0
 11615  11616  11617 -847  11620 0

c  1+1 --> 2
c    (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0 ∧  p_847) -> (-b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0)
c  in CNF:
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_2
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨  b^{11, 78}_1
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ -p_847 ∨ -b^{11, 78}_0
c  in DIMACS:
 11615  11616 -11617 -847 -11618 0
 11615  11616 -11617 -847  11619 0
 11615  11616 -11617 -847 -11620 0

c  2+1 --> break 
c    (-b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧  p_847) -> break
c  in CNF:
c     b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ -p_847 ∨ break
c  in DIMACS:
 11615 -11616  11617 -847 1162 0


c  2-1 --> 1
c    (-b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧ -p_847) -> (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0)
c  in CNF:
c     b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_2
c     b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_1
c     b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨  b^{11, 78}_0
c  in DIMACS:
 11615 -11616  11617  847 -11618 0
 11615 -11616  11617  847 -11619 0
 11615 -11616  11617  847  11620 0

c  1-1 --> 0
c    (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0 ∧ -p_847) -> (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧ -b^{11, 78}_0)
c  in CNF:
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_2
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_1
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_0
c  in DIMACS:
 11615  11616 -11617  847 -11618 0
 11615  11616 -11617  847 -11619 0
 11615  11616 -11617  847 -11620 0

c  0-1 --> -1
c    (-b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧ -p_847) -> ( b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0)
c  in CNF:
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨  b^{11, 78}_2
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_1
c     b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨  b^{11, 78}_0
c  in DIMACS:
 11615  11616  11617  847  11618 0
 11615  11616  11617  847 -11619 0
 11615  11616  11617  847  11620 0

c  -1-1 --> -2
c    ( b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧  b^{11, 77}_0 ∧ -p_847) -> ( b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0)
c  in CNF:
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨  b^{11, 78}_2
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨  b^{11, 78}_1
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨  p_847 ∨ -b^{11, 78}_0
c  in DIMACS:
-11615  11616 -11617  847  11618 0
-11615  11616 -11617  847  11619 0
-11615  11616 -11617  847 -11620 0

c  -2-1 --> break 
c    ( b^{11, 77}_2 ∧  b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧ -p_847) -> break
c  in CNF:
c    -b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨  b^{11, 77}_0 ∨  p_847 ∨ break
c  in DIMACS:
-11615 -11616  11617  847 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 77}_2 ∧ -b^{11, 77}_1 ∧ -b^{11, 77}_0 ∧ true) 
c  in CNF:
c    -b^{11, 77}_2 ∨  b^{11, 77}_1 ∨  b^{11, 77}_0 ∨ false 
c  in DIMACS:
-11615  11616  11617  0

c  3 does not represent an automaton state.
c    -(-b^{11, 77}_2 ∧  b^{11, 77}_1 ∧  b^{11, 77}_0 ∧ true) 
c  in CNF:
c     b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ false 
c  in DIMACS:
 11615 -11616 -11617  0
c  -3 does not represent an automaton state.
c    -( b^{11, 77}_2 ∧  b^{11, 77}_1 ∧  b^{11, 77}_0 ∧ true) 
c  in CNF:
c    -b^{11, 77}_2 ∨ -b^{11, 77}_1 ∨ -b^{11, 77}_0 ∨ false 
c  in DIMACS:
-11615 -11616 -11617  0

c i = 78
c  -2+1 --> -1
c    ( b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧  p_858) -> ( b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0)
c  in CNF:
c    -b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨  b^{11, 79}_2
c    -b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_1
c    -b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨  b^{11, 79}_0
c  in DIMACS:
-11618 -11619  11620 -858  11621 0
-11618 -11619  11620 -858 -11622 0
-11618 -11619  11620 -858  11623 0

c  -1+1 --> 0
c    ( b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0 ∧  p_858) -> (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧ -b^{11, 79}_0)
c  in CNF:
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_2
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_1
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_0
c  in DIMACS:
-11618  11619 -11620 -858 -11621 0
-11618  11619 -11620 -858 -11622 0
-11618  11619 -11620 -858 -11623 0

c  0+1 --> 1
c    (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧  p_858) -> (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0)
c  in CNF:
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_2
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_1
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨  b^{11, 79}_0
c  in DIMACS:
 11618  11619  11620 -858 -11621 0
 11618  11619  11620 -858 -11622 0
 11618  11619  11620 -858  11623 0

c  1+1 --> 2
c    (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0 ∧  p_858) -> (-b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0)
c  in CNF:
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_2
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨  b^{11, 79}_1
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ -p_858 ∨ -b^{11, 79}_0
c  in DIMACS:
 11618  11619 -11620 -858 -11621 0
 11618  11619 -11620 -858  11622 0
 11618  11619 -11620 -858 -11623 0

c  2+1 --> break 
c    (-b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧  p_858) -> break
c  in CNF:
c     b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 11618 -11619  11620 -858 1162 0


c  2-1 --> 1
c    (-b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧ -p_858) -> (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0)
c  in CNF:
c     b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_2
c     b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_1
c     b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨  b^{11, 79}_0
c  in DIMACS:
 11618 -11619  11620  858 -11621 0
 11618 -11619  11620  858 -11622 0
 11618 -11619  11620  858  11623 0

c  1-1 --> 0
c    (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0 ∧ -p_858) -> (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧ -b^{11, 79}_0)
c  in CNF:
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_2
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_1
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_0
c  in DIMACS:
 11618  11619 -11620  858 -11621 0
 11618  11619 -11620  858 -11622 0
 11618  11619 -11620  858 -11623 0

c  0-1 --> -1
c    (-b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧ -p_858) -> ( b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0)
c  in CNF:
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨  b^{11, 79}_2
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_1
c     b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨  b^{11, 79}_0
c  in DIMACS:
 11618  11619  11620  858  11621 0
 11618  11619  11620  858 -11622 0
 11618  11619  11620  858  11623 0

c  -1-1 --> -2
c    ( b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧  b^{11, 78}_0 ∧ -p_858) -> ( b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0)
c  in CNF:
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨  b^{11, 79}_2
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨  b^{11, 79}_1
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨  p_858 ∨ -b^{11, 79}_0
c  in DIMACS:
-11618  11619 -11620  858  11621 0
-11618  11619 -11620  858  11622 0
-11618  11619 -11620  858 -11623 0

c  -2-1 --> break 
c    ( b^{11, 78}_2 ∧  b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨  b^{11, 78}_0 ∨  p_858 ∨ break
c  in DIMACS:
-11618 -11619  11620  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 78}_2 ∧ -b^{11, 78}_1 ∧ -b^{11, 78}_0 ∧ true) 
c  in CNF:
c    -b^{11, 78}_2 ∨  b^{11, 78}_1 ∨  b^{11, 78}_0 ∨ false 
c  in DIMACS:
-11618  11619  11620  0

c  3 does not represent an automaton state.
c    -(-b^{11, 78}_2 ∧  b^{11, 78}_1 ∧  b^{11, 78}_0 ∧ true) 
c  in CNF:
c     b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ false 
c  in DIMACS:
 11618 -11619 -11620  0
c  -3 does not represent an automaton state.
c    -( b^{11, 78}_2 ∧  b^{11, 78}_1 ∧  b^{11, 78}_0 ∧ true) 
c  in CNF:
c    -b^{11, 78}_2 ∨ -b^{11, 78}_1 ∨ -b^{11, 78}_0 ∨ false 
c  in DIMACS:
-11618 -11619 -11620  0

c i = 79
c  -2+1 --> -1
c    ( b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧  p_869) -> ( b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0)
c  in CNF:
c    -b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨  b^{11, 80}_2
c    -b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_1
c    -b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨  b^{11, 80}_0
c  in DIMACS:
-11621 -11622  11623 -869  11624 0
-11621 -11622  11623 -869 -11625 0
-11621 -11622  11623 -869  11626 0

c  -1+1 --> 0
c    ( b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0 ∧  p_869) -> (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧ -b^{11, 80}_0)
c  in CNF:
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_2
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_1
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_0
c  in DIMACS:
-11621  11622 -11623 -869 -11624 0
-11621  11622 -11623 -869 -11625 0
-11621  11622 -11623 -869 -11626 0

c  0+1 --> 1
c    (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧  p_869) -> (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0)
c  in CNF:
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_2
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_1
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨  b^{11, 80}_0
c  in DIMACS:
 11621  11622  11623 -869 -11624 0
 11621  11622  11623 -869 -11625 0
 11621  11622  11623 -869  11626 0

c  1+1 --> 2
c    (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0 ∧  p_869) -> (-b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0)
c  in CNF:
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_2
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨  b^{11, 80}_1
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ -p_869 ∨ -b^{11, 80}_0
c  in DIMACS:
 11621  11622 -11623 -869 -11624 0
 11621  11622 -11623 -869  11625 0
 11621  11622 -11623 -869 -11626 0

c  2+1 --> break 
c    (-b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧  p_869) -> break
c  in CNF:
c     b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ -p_869 ∨ break
c  in DIMACS:
 11621 -11622  11623 -869 1162 0


c  2-1 --> 1
c    (-b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧ -p_869) -> (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0)
c  in CNF:
c     b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_2
c     b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_1
c     b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨  b^{11, 80}_0
c  in DIMACS:
 11621 -11622  11623  869 -11624 0
 11621 -11622  11623  869 -11625 0
 11621 -11622  11623  869  11626 0

c  1-1 --> 0
c    (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0 ∧ -p_869) -> (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧ -b^{11, 80}_0)
c  in CNF:
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_2
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_1
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_0
c  in DIMACS:
 11621  11622 -11623  869 -11624 0
 11621  11622 -11623  869 -11625 0
 11621  11622 -11623  869 -11626 0

c  0-1 --> -1
c    (-b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧ -p_869) -> ( b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0)
c  in CNF:
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨  b^{11, 80}_2
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_1
c     b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨  b^{11, 80}_0
c  in DIMACS:
 11621  11622  11623  869  11624 0
 11621  11622  11623  869 -11625 0
 11621  11622  11623  869  11626 0

c  -1-1 --> -2
c    ( b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧  b^{11, 79}_0 ∧ -p_869) -> ( b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0)
c  in CNF:
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨  b^{11, 80}_2
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨  b^{11, 80}_1
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨  p_869 ∨ -b^{11, 80}_0
c  in DIMACS:
-11621  11622 -11623  869  11624 0
-11621  11622 -11623  869  11625 0
-11621  11622 -11623  869 -11626 0

c  -2-1 --> break 
c    ( b^{11, 79}_2 ∧  b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧ -p_869) -> break
c  in CNF:
c    -b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨  b^{11, 79}_0 ∨  p_869 ∨ break
c  in DIMACS:
-11621 -11622  11623  869 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 79}_2 ∧ -b^{11, 79}_1 ∧ -b^{11, 79}_0 ∧ true) 
c  in CNF:
c    -b^{11, 79}_2 ∨  b^{11, 79}_1 ∨  b^{11, 79}_0 ∨ false 
c  in DIMACS:
-11621  11622  11623  0

c  3 does not represent an automaton state.
c    -(-b^{11, 79}_2 ∧  b^{11, 79}_1 ∧  b^{11, 79}_0 ∧ true) 
c  in CNF:
c     b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ false 
c  in DIMACS:
 11621 -11622 -11623  0
c  -3 does not represent an automaton state.
c    -( b^{11, 79}_2 ∧  b^{11, 79}_1 ∧  b^{11, 79}_0 ∧ true) 
c  in CNF:
c    -b^{11, 79}_2 ∨ -b^{11, 79}_1 ∨ -b^{11, 79}_0 ∨ false 
c  in DIMACS:
-11621 -11622 -11623  0

c i = 80
c  -2+1 --> -1
c    ( b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧  p_880) -> ( b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0)
c  in CNF:
c    -b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨  b^{11, 81}_2
c    -b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_1
c    -b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨  b^{11, 81}_0
c  in DIMACS:
-11624 -11625  11626 -880  11627 0
-11624 -11625  11626 -880 -11628 0
-11624 -11625  11626 -880  11629 0

c  -1+1 --> 0
c    ( b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0 ∧  p_880) -> (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧ -b^{11, 81}_0)
c  in CNF:
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_2
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_1
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_0
c  in DIMACS:
-11624  11625 -11626 -880 -11627 0
-11624  11625 -11626 -880 -11628 0
-11624  11625 -11626 -880 -11629 0

c  0+1 --> 1
c    (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧  p_880) -> (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0)
c  in CNF:
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_2
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_1
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨  b^{11, 81}_0
c  in DIMACS:
 11624  11625  11626 -880 -11627 0
 11624  11625  11626 -880 -11628 0
 11624  11625  11626 -880  11629 0

c  1+1 --> 2
c    (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0 ∧  p_880) -> (-b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0)
c  in CNF:
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_2
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨  b^{11, 81}_1
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ -p_880 ∨ -b^{11, 81}_0
c  in DIMACS:
 11624  11625 -11626 -880 -11627 0
 11624  11625 -11626 -880  11628 0
 11624  11625 -11626 -880 -11629 0

c  2+1 --> break 
c    (-b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧  p_880) -> break
c  in CNF:
c     b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 11624 -11625  11626 -880 1162 0


c  2-1 --> 1
c    (-b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧ -p_880) -> (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0)
c  in CNF:
c     b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_2
c     b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_1
c     b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨  b^{11, 81}_0
c  in DIMACS:
 11624 -11625  11626  880 -11627 0
 11624 -11625  11626  880 -11628 0
 11624 -11625  11626  880  11629 0

c  1-1 --> 0
c    (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0 ∧ -p_880) -> (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧ -b^{11, 81}_0)
c  in CNF:
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_2
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_1
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_0
c  in DIMACS:
 11624  11625 -11626  880 -11627 0
 11624  11625 -11626  880 -11628 0
 11624  11625 -11626  880 -11629 0

c  0-1 --> -1
c    (-b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧ -p_880) -> ( b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0)
c  in CNF:
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨  b^{11, 81}_2
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_1
c     b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨  b^{11, 81}_0
c  in DIMACS:
 11624  11625  11626  880  11627 0
 11624  11625  11626  880 -11628 0
 11624  11625  11626  880  11629 0

c  -1-1 --> -2
c    ( b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧  b^{11, 80}_0 ∧ -p_880) -> ( b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0)
c  in CNF:
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨  b^{11, 81}_2
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨  b^{11, 81}_1
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨  p_880 ∨ -b^{11, 81}_0
c  in DIMACS:
-11624  11625 -11626  880  11627 0
-11624  11625 -11626  880  11628 0
-11624  11625 -11626  880 -11629 0

c  -2-1 --> break 
c    ( b^{11, 80}_2 ∧  b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨  b^{11, 80}_0 ∨  p_880 ∨ break
c  in DIMACS:
-11624 -11625  11626  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 80}_2 ∧ -b^{11, 80}_1 ∧ -b^{11, 80}_0 ∧ true) 
c  in CNF:
c    -b^{11, 80}_2 ∨  b^{11, 80}_1 ∨  b^{11, 80}_0 ∨ false 
c  in DIMACS:
-11624  11625  11626  0

c  3 does not represent an automaton state.
c    -(-b^{11, 80}_2 ∧  b^{11, 80}_1 ∧  b^{11, 80}_0 ∧ true) 
c  in CNF:
c     b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ false 
c  in DIMACS:
 11624 -11625 -11626  0
c  -3 does not represent an automaton state.
c    -( b^{11, 80}_2 ∧  b^{11, 80}_1 ∧  b^{11, 80}_0 ∧ true) 
c  in CNF:
c    -b^{11, 80}_2 ∨ -b^{11, 80}_1 ∨ -b^{11, 80}_0 ∨ false 
c  in DIMACS:
-11624 -11625 -11626  0

c i = 81
c  -2+1 --> -1
c    ( b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧  p_891) -> ( b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0)
c  in CNF:
c    -b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨  b^{11, 82}_2
c    -b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_1
c    -b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨  b^{11, 82}_0
c  in DIMACS:
-11627 -11628  11629 -891  11630 0
-11627 -11628  11629 -891 -11631 0
-11627 -11628  11629 -891  11632 0

c  -1+1 --> 0
c    ( b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0 ∧  p_891) -> (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧ -b^{11, 82}_0)
c  in CNF:
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_2
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_1
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_0
c  in DIMACS:
-11627  11628 -11629 -891 -11630 0
-11627  11628 -11629 -891 -11631 0
-11627  11628 -11629 -891 -11632 0

c  0+1 --> 1
c    (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧  p_891) -> (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0)
c  in CNF:
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_2
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_1
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨  b^{11, 82}_0
c  in DIMACS:
 11627  11628  11629 -891 -11630 0
 11627  11628  11629 -891 -11631 0
 11627  11628  11629 -891  11632 0

c  1+1 --> 2
c    (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0 ∧  p_891) -> (-b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0)
c  in CNF:
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_2
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨  b^{11, 82}_1
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ -p_891 ∨ -b^{11, 82}_0
c  in DIMACS:
 11627  11628 -11629 -891 -11630 0
 11627  11628 -11629 -891  11631 0
 11627  11628 -11629 -891 -11632 0

c  2+1 --> break 
c    (-b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧  p_891) -> break
c  in CNF:
c     b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 11627 -11628  11629 -891 1162 0


c  2-1 --> 1
c    (-b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧ -p_891) -> (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0)
c  in CNF:
c     b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_2
c     b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_1
c     b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨  b^{11, 82}_0
c  in DIMACS:
 11627 -11628  11629  891 -11630 0
 11627 -11628  11629  891 -11631 0
 11627 -11628  11629  891  11632 0

c  1-1 --> 0
c    (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0 ∧ -p_891) -> (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧ -b^{11, 82}_0)
c  in CNF:
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_2
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_1
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_0
c  in DIMACS:
 11627  11628 -11629  891 -11630 0
 11627  11628 -11629  891 -11631 0
 11627  11628 -11629  891 -11632 0

c  0-1 --> -1
c    (-b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧ -p_891) -> ( b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0)
c  in CNF:
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨  b^{11, 82}_2
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_1
c     b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨  b^{11, 82}_0
c  in DIMACS:
 11627  11628  11629  891  11630 0
 11627  11628  11629  891 -11631 0
 11627  11628  11629  891  11632 0

c  -1-1 --> -2
c    ( b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧  b^{11, 81}_0 ∧ -p_891) -> ( b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0)
c  in CNF:
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨  b^{11, 82}_2
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨  b^{11, 82}_1
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨  p_891 ∨ -b^{11, 82}_0
c  in DIMACS:
-11627  11628 -11629  891  11630 0
-11627  11628 -11629  891  11631 0
-11627  11628 -11629  891 -11632 0

c  -2-1 --> break 
c    ( b^{11, 81}_2 ∧  b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨  b^{11, 81}_0 ∨  p_891 ∨ break
c  in DIMACS:
-11627 -11628  11629  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 81}_2 ∧ -b^{11, 81}_1 ∧ -b^{11, 81}_0 ∧ true) 
c  in CNF:
c    -b^{11, 81}_2 ∨  b^{11, 81}_1 ∨  b^{11, 81}_0 ∨ false 
c  in DIMACS:
-11627  11628  11629  0

c  3 does not represent an automaton state.
c    -(-b^{11, 81}_2 ∧  b^{11, 81}_1 ∧  b^{11, 81}_0 ∧ true) 
c  in CNF:
c     b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ false 
c  in DIMACS:
 11627 -11628 -11629  0
c  -3 does not represent an automaton state.
c    -( b^{11, 81}_2 ∧  b^{11, 81}_1 ∧  b^{11, 81}_0 ∧ true) 
c  in CNF:
c    -b^{11, 81}_2 ∨ -b^{11, 81}_1 ∨ -b^{11, 81}_0 ∨ false 
c  in DIMACS:
-11627 -11628 -11629  0

c i = 82
c  -2+1 --> -1
c    ( b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧  p_902) -> ( b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0)
c  in CNF:
c    -b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨  b^{11, 83}_2
c    -b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_1
c    -b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨  b^{11, 83}_0
c  in DIMACS:
-11630 -11631  11632 -902  11633 0
-11630 -11631  11632 -902 -11634 0
-11630 -11631  11632 -902  11635 0

c  -1+1 --> 0
c    ( b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0 ∧  p_902) -> (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧ -b^{11, 83}_0)
c  in CNF:
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_2
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_1
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_0
c  in DIMACS:
-11630  11631 -11632 -902 -11633 0
-11630  11631 -11632 -902 -11634 0
-11630  11631 -11632 -902 -11635 0

c  0+1 --> 1
c    (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧  p_902) -> (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0)
c  in CNF:
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_2
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_1
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨  b^{11, 83}_0
c  in DIMACS:
 11630  11631  11632 -902 -11633 0
 11630  11631  11632 -902 -11634 0
 11630  11631  11632 -902  11635 0

c  1+1 --> 2
c    (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0 ∧  p_902) -> (-b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0)
c  in CNF:
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_2
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨  b^{11, 83}_1
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ -p_902 ∨ -b^{11, 83}_0
c  in DIMACS:
 11630  11631 -11632 -902 -11633 0
 11630  11631 -11632 -902  11634 0
 11630  11631 -11632 -902 -11635 0

c  2+1 --> break 
c    (-b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧  p_902) -> break
c  in CNF:
c     b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 11630 -11631  11632 -902 1162 0


c  2-1 --> 1
c    (-b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧ -p_902) -> (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0)
c  in CNF:
c     b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_2
c     b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_1
c     b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨  b^{11, 83}_0
c  in DIMACS:
 11630 -11631  11632  902 -11633 0
 11630 -11631  11632  902 -11634 0
 11630 -11631  11632  902  11635 0

c  1-1 --> 0
c    (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0 ∧ -p_902) -> (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧ -b^{11, 83}_0)
c  in CNF:
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_2
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_1
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_0
c  in DIMACS:
 11630  11631 -11632  902 -11633 0
 11630  11631 -11632  902 -11634 0
 11630  11631 -11632  902 -11635 0

c  0-1 --> -1
c    (-b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧ -p_902) -> ( b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0)
c  in CNF:
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨  b^{11, 83}_2
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_1
c     b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨  b^{11, 83}_0
c  in DIMACS:
 11630  11631  11632  902  11633 0
 11630  11631  11632  902 -11634 0
 11630  11631  11632  902  11635 0

c  -1-1 --> -2
c    ( b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧  b^{11, 82}_0 ∧ -p_902) -> ( b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0)
c  in CNF:
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨  b^{11, 83}_2
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨  b^{11, 83}_1
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨  p_902 ∨ -b^{11, 83}_0
c  in DIMACS:
-11630  11631 -11632  902  11633 0
-11630  11631 -11632  902  11634 0
-11630  11631 -11632  902 -11635 0

c  -2-1 --> break 
c    ( b^{11, 82}_2 ∧  b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨  b^{11, 82}_0 ∨  p_902 ∨ break
c  in DIMACS:
-11630 -11631  11632  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 82}_2 ∧ -b^{11, 82}_1 ∧ -b^{11, 82}_0 ∧ true) 
c  in CNF:
c    -b^{11, 82}_2 ∨  b^{11, 82}_1 ∨  b^{11, 82}_0 ∨ false 
c  in DIMACS:
-11630  11631  11632  0

c  3 does not represent an automaton state.
c    -(-b^{11, 82}_2 ∧  b^{11, 82}_1 ∧  b^{11, 82}_0 ∧ true) 
c  in CNF:
c     b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ false 
c  in DIMACS:
 11630 -11631 -11632  0
c  -3 does not represent an automaton state.
c    -( b^{11, 82}_2 ∧  b^{11, 82}_1 ∧  b^{11, 82}_0 ∧ true) 
c  in CNF:
c    -b^{11, 82}_2 ∨ -b^{11, 82}_1 ∨ -b^{11, 82}_0 ∨ false 
c  in DIMACS:
-11630 -11631 -11632  0

c i = 83
c  -2+1 --> -1
c    ( b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧  p_913) -> ( b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0)
c  in CNF:
c    -b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨  b^{11, 84}_2
c    -b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_1
c    -b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨  b^{11, 84}_0
c  in DIMACS:
-11633 -11634  11635 -913  11636 0
-11633 -11634  11635 -913 -11637 0
-11633 -11634  11635 -913  11638 0

c  -1+1 --> 0
c    ( b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0 ∧  p_913) -> (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧ -b^{11, 84}_0)
c  in CNF:
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_2
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_1
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_0
c  in DIMACS:
-11633  11634 -11635 -913 -11636 0
-11633  11634 -11635 -913 -11637 0
-11633  11634 -11635 -913 -11638 0

c  0+1 --> 1
c    (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧  p_913) -> (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0)
c  in CNF:
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_2
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_1
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨  b^{11, 84}_0
c  in DIMACS:
 11633  11634  11635 -913 -11636 0
 11633  11634  11635 -913 -11637 0
 11633  11634  11635 -913  11638 0

c  1+1 --> 2
c    (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0 ∧  p_913) -> (-b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0)
c  in CNF:
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_2
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨  b^{11, 84}_1
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ -p_913 ∨ -b^{11, 84}_0
c  in DIMACS:
 11633  11634 -11635 -913 -11636 0
 11633  11634 -11635 -913  11637 0
 11633  11634 -11635 -913 -11638 0

c  2+1 --> break 
c    (-b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧  p_913) -> break
c  in CNF:
c     b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ -p_913 ∨ break
c  in DIMACS:
 11633 -11634  11635 -913 1162 0


c  2-1 --> 1
c    (-b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧ -p_913) -> (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0)
c  in CNF:
c     b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_2
c     b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_1
c     b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨  b^{11, 84}_0
c  in DIMACS:
 11633 -11634  11635  913 -11636 0
 11633 -11634  11635  913 -11637 0
 11633 -11634  11635  913  11638 0

c  1-1 --> 0
c    (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0 ∧ -p_913) -> (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧ -b^{11, 84}_0)
c  in CNF:
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_2
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_1
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_0
c  in DIMACS:
 11633  11634 -11635  913 -11636 0
 11633  11634 -11635  913 -11637 0
 11633  11634 -11635  913 -11638 0

c  0-1 --> -1
c    (-b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧ -p_913) -> ( b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0)
c  in CNF:
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨  b^{11, 84}_2
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_1
c     b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨  b^{11, 84}_0
c  in DIMACS:
 11633  11634  11635  913  11636 0
 11633  11634  11635  913 -11637 0
 11633  11634  11635  913  11638 0

c  -1-1 --> -2
c    ( b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧  b^{11, 83}_0 ∧ -p_913) -> ( b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0)
c  in CNF:
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨  b^{11, 84}_2
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨  b^{11, 84}_1
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨  p_913 ∨ -b^{11, 84}_0
c  in DIMACS:
-11633  11634 -11635  913  11636 0
-11633  11634 -11635  913  11637 0
-11633  11634 -11635  913 -11638 0

c  -2-1 --> break 
c    ( b^{11, 83}_2 ∧  b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧ -p_913) -> break
c  in CNF:
c    -b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨  b^{11, 83}_0 ∨  p_913 ∨ break
c  in DIMACS:
-11633 -11634  11635  913 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 83}_2 ∧ -b^{11, 83}_1 ∧ -b^{11, 83}_0 ∧ true) 
c  in CNF:
c    -b^{11, 83}_2 ∨  b^{11, 83}_1 ∨  b^{11, 83}_0 ∨ false 
c  in DIMACS:
-11633  11634  11635  0

c  3 does not represent an automaton state.
c    -(-b^{11, 83}_2 ∧  b^{11, 83}_1 ∧  b^{11, 83}_0 ∧ true) 
c  in CNF:
c     b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ false 
c  in DIMACS:
 11633 -11634 -11635  0
c  -3 does not represent an automaton state.
c    -( b^{11, 83}_2 ∧  b^{11, 83}_1 ∧  b^{11, 83}_0 ∧ true) 
c  in CNF:
c    -b^{11, 83}_2 ∨ -b^{11, 83}_1 ∨ -b^{11, 83}_0 ∨ false 
c  in DIMACS:
-11633 -11634 -11635  0

c i = 84
c  -2+1 --> -1
c    ( b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧  p_924) -> ( b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0)
c  in CNF:
c    -b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨  b^{11, 85}_2
c    -b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_1
c    -b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨  b^{11, 85}_0
c  in DIMACS:
-11636 -11637  11638 -924  11639 0
-11636 -11637  11638 -924 -11640 0
-11636 -11637  11638 -924  11641 0

c  -1+1 --> 0
c    ( b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0 ∧  p_924) -> (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧ -b^{11, 85}_0)
c  in CNF:
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_2
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_1
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_0
c  in DIMACS:
-11636  11637 -11638 -924 -11639 0
-11636  11637 -11638 -924 -11640 0
-11636  11637 -11638 -924 -11641 0

c  0+1 --> 1
c    (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧  p_924) -> (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0)
c  in CNF:
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_2
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_1
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨  b^{11, 85}_0
c  in DIMACS:
 11636  11637  11638 -924 -11639 0
 11636  11637  11638 -924 -11640 0
 11636  11637  11638 -924  11641 0

c  1+1 --> 2
c    (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0 ∧  p_924) -> (-b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0)
c  in CNF:
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_2
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨  b^{11, 85}_1
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ -p_924 ∨ -b^{11, 85}_0
c  in DIMACS:
 11636  11637 -11638 -924 -11639 0
 11636  11637 -11638 -924  11640 0
 11636  11637 -11638 -924 -11641 0

c  2+1 --> break 
c    (-b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧  p_924) -> break
c  in CNF:
c     b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 11636 -11637  11638 -924 1162 0


c  2-1 --> 1
c    (-b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧ -p_924) -> (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0)
c  in CNF:
c     b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_2
c     b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_1
c     b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨  b^{11, 85}_0
c  in DIMACS:
 11636 -11637  11638  924 -11639 0
 11636 -11637  11638  924 -11640 0
 11636 -11637  11638  924  11641 0

c  1-1 --> 0
c    (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0 ∧ -p_924) -> (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧ -b^{11, 85}_0)
c  in CNF:
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_2
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_1
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_0
c  in DIMACS:
 11636  11637 -11638  924 -11639 0
 11636  11637 -11638  924 -11640 0
 11636  11637 -11638  924 -11641 0

c  0-1 --> -1
c    (-b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧ -p_924) -> ( b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0)
c  in CNF:
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨  b^{11, 85}_2
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_1
c     b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨  b^{11, 85}_0
c  in DIMACS:
 11636  11637  11638  924  11639 0
 11636  11637  11638  924 -11640 0
 11636  11637  11638  924  11641 0

c  -1-1 --> -2
c    ( b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧  b^{11, 84}_0 ∧ -p_924) -> ( b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0)
c  in CNF:
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨  b^{11, 85}_2
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨  b^{11, 85}_1
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨  p_924 ∨ -b^{11, 85}_0
c  in DIMACS:
-11636  11637 -11638  924  11639 0
-11636  11637 -11638  924  11640 0
-11636  11637 -11638  924 -11641 0

c  -2-1 --> break 
c    ( b^{11, 84}_2 ∧  b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨  b^{11, 84}_0 ∨  p_924 ∨ break
c  in DIMACS:
-11636 -11637  11638  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 84}_2 ∧ -b^{11, 84}_1 ∧ -b^{11, 84}_0 ∧ true) 
c  in CNF:
c    -b^{11, 84}_2 ∨  b^{11, 84}_1 ∨  b^{11, 84}_0 ∨ false 
c  in DIMACS:
-11636  11637  11638  0

c  3 does not represent an automaton state.
c    -(-b^{11, 84}_2 ∧  b^{11, 84}_1 ∧  b^{11, 84}_0 ∧ true) 
c  in CNF:
c     b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ false 
c  in DIMACS:
 11636 -11637 -11638  0
c  -3 does not represent an automaton state.
c    -( b^{11, 84}_2 ∧  b^{11, 84}_1 ∧  b^{11, 84}_0 ∧ true) 
c  in CNF:
c    -b^{11, 84}_2 ∨ -b^{11, 84}_1 ∨ -b^{11, 84}_0 ∨ false 
c  in DIMACS:
-11636 -11637 -11638  0

c i = 85
c  -2+1 --> -1
c    ( b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧  p_935) -> ( b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0)
c  in CNF:
c    -b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨  b^{11, 86}_2
c    -b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_1
c    -b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨  b^{11, 86}_0
c  in DIMACS:
-11639 -11640  11641 -935  11642 0
-11639 -11640  11641 -935 -11643 0
-11639 -11640  11641 -935  11644 0

c  -1+1 --> 0
c    ( b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0 ∧  p_935) -> (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧ -b^{11, 86}_0)
c  in CNF:
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_2
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_1
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_0
c  in DIMACS:
-11639  11640 -11641 -935 -11642 0
-11639  11640 -11641 -935 -11643 0
-11639  11640 -11641 -935 -11644 0

c  0+1 --> 1
c    (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧  p_935) -> (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0)
c  in CNF:
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_2
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_1
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨  b^{11, 86}_0
c  in DIMACS:
 11639  11640  11641 -935 -11642 0
 11639  11640  11641 -935 -11643 0
 11639  11640  11641 -935  11644 0

c  1+1 --> 2
c    (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0 ∧  p_935) -> (-b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0)
c  in CNF:
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_2
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨  b^{11, 86}_1
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ -p_935 ∨ -b^{11, 86}_0
c  in DIMACS:
 11639  11640 -11641 -935 -11642 0
 11639  11640 -11641 -935  11643 0
 11639  11640 -11641 -935 -11644 0

c  2+1 --> break 
c    (-b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧  p_935) -> break
c  in CNF:
c     b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 11639 -11640  11641 -935 1162 0


c  2-1 --> 1
c    (-b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧ -p_935) -> (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0)
c  in CNF:
c     b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_2
c     b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_1
c     b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨  b^{11, 86}_0
c  in DIMACS:
 11639 -11640  11641  935 -11642 0
 11639 -11640  11641  935 -11643 0
 11639 -11640  11641  935  11644 0

c  1-1 --> 0
c    (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0 ∧ -p_935) -> (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧ -b^{11, 86}_0)
c  in CNF:
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_2
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_1
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_0
c  in DIMACS:
 11639  11640 -11641  935 -11642 0
 11639  11640 -11641  935 -11643 0
 11639  11640 -11641  935 -11644 0

c  0-1 --> -1
c    (-b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧ -p_935) -> ( b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0)
c  in CNF:
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨  b^{11, 86}_2
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_1
c     b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨  b^{11, 86}_0
c  in DIMACS:
 11639  11640  11641  935  11642 0
 11639  11640  11641  935 -11643 0
 11639  11640  11641  935  11644 0

c  -1-1 --> -2
c    ( b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧  b^{11, 85}_0 ∧ -p_935) -> ( b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0)
c  in CNF:
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨  b^{11, 86}_2
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨  b^{11, 86}_1
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨  p_935 ∨ -b^{11, 86}_0
c  in DIMACS:
-11639  11640 -11641  935  11642 0
-11639  11640 -11641  935  11643 0
-11639  11640 -11641  935 -11644 0

c  -2-1 --> break 
c    ( b^{11, 85}_2 ∧  b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨  b^{11, 85}_0 ∨  p_935 ∨ break
c  in DIMACS:
-11639 -11640  11641  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 85}_2 ∧ -b^{11, 85}_1 ∧ -b^{11, 85}_0 ∧ true) 
c  in CNF:
c    -b^{11, 85}_2 ∨  b^{11, 85}_1 ∨  b^{11, 85}_0 ∨ false 
c  in DIMACS:
-11639  11640  11641  0

c  3 does not represent an automaton state.
c    -(-b^{11, 85}_2 ∧  b^{11, 85}_1 ∧  b^{11, 85}_0 ∧ true) 
c  in CNF:
c     b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ false 
c  in DIMACS:
 11639 -11640 -11641  0
c  -3 does not represent an automaton state.
c    -( b^{11, 85}_2 ∧  b^{11, 85}_1 ∧  b^{11, 85}_0 ∧ true) 
c  in CNF:
c    -b^{11, 85}_2 ∨ -b^{11, 85}_1 ∨ -b^{11, 85}_0 ∨ false 
c  in DIMACS:
-11639 -11640 -11641  0

c i = 86
c  -2+1 --> -1
c    ( b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧  p_946) -> ( b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0)
c  in CNF:
c    -b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨  b^{11, 87}_2
c    -b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_1
c    -b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨  b^{11, 87}_0
c  in DIMACS:
-11642 -11643  11644 -946  11645 0
-11642 -11643  11644 -946 -11646 0
-11642 -11643  11644 -946  11647 0

c  -1+1 --> 0
c    ( b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0 ∧  p_946) -> (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧ -b^{11, 87}_0)
c  in CNF:
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_2
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_1
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_0
c  in DIMACS:
-11642  11643 -11644 -946 -11645 0
-11642  11643 -11644 -946 -11646 0
-11642  11643 -11644 -946 -11647 0

c  0+1 --> 1
c    (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧  p_946) -> (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0)
c  in CNF:
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_2
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_1
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨  b^{11, 87}_0
c  in DIMACS:
 11642  11643  11644 -946 -11645 0
 11642  11643  11644 -946 -11646 0
 11642  11643  11644 -946  11647 0

c  1+1 --> 2
c    (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0 ∧  p_946) -> (-b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0)
c  in CNF:
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_2
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨  b^{11, 87}_1
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ -p_946 ∨ -b^{11, 87}_0
c  in DIMACS:
 11642  11643 -11644 -946 -11645 0
 11642  11643 -11644 -946  11646 0
 11642  11643 -11644 -946 -11647 0

c  2+1 --> break 
c    (-b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧  p_946) -> break
c  in CNF:
c     b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 11642 -11643  11644 -946 1162 0


c  2-1 --> 1
c    (-b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧ -p_946) -> (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0)
c  in CNF:
c     b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_2
c     b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_1
c     b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨  b^{11, 87}_0
c  in DIMACS:
 11642 -11643  11644  946 -11645 0
 11642 -11643  11644  946 -11646 0
 11642 -11643  11644  946  11647 0

c  1-1 --> 0
c    (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0 ∧ -p_946) -> (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧ -b^{11, 87}_0)
c  in CNF:
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_2
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_1
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_0
c  in DIMACS:
 11642  11643 -11644  946 -11645 0
 11642  11643 -11644  946 -11646 0
 11642  11643 -11644  946 -11647 0

c  0-1 --> -1
c    (-b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧ -p_946) -> ( b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0)
c  in CNF:
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨  b^{11, 87}_2
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_1
c     b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨  b^{11, 87}_0
c  in DIMACS:
 11642  11643  11644  946  11645 0
 11642  11643  11644  946 -11646 0
 11642  11643  11644  946  11647 0

c  -1-1 --> -2
c    ( b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧  b^{11, 86}_0 ∧ -p_946) -> ( b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0)
c  in CNF:
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨  b^{11, 87}_2
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨  b^{11, 87}_1
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨  p_946 ∨ -b^{11, 87}_0
c  in DIMACS:
-11642  11643 -11644  946  11645 0
-11642  11643 -11644  946  11646 0
-11642  11643 -11644  946 -11647 0

c  -2-1 --> break 
c    ( b^{11, 86}_2 ∧  b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨  b^{11, 86}_0 ∨  p_946 ∨ break
c  in DIMACS:
-11642 -11643  11644  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 86}_2 ∧ -b^{11, 86}_1 ∧ -b^{11, 86}_0 ∧ true) 
c  in CNF:
c    -b^{11, 86}_2 ∨  b^{11, 86}_1 ∨  b^{11, 86}_0 ∨ false 
c  in DIMACS:
-11642  11643  11644  0

c  3 does not represent an automaton state.
c    -(-b^{11, 86}_2 ∧  b^{11, 86}_1 ∧  b^{11, 86}_0 ∧ true) 
c  in CNF:
c     b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ false 
c  in DIMACS:
 11642 -11643 -11644  0
c  -3 does not represent an automaton state.
c    -( b^{11, 86}_2 ∧  b^{11, 86}_1 ∧  b^{11, 86}_0 ∧ true) 
c  in CNF:
c    -b^{11, 86}_2 ∨ -b^{11, 86}_1 ∨ -b^{11, 86}_0 ∨ false 
c  in DIMACS:
-11642 -11643 -11644  0

c i = 87
c  -2+1 --> -1
c    ( b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧  p_957) -> ( b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0)
c  in CNF:
c    -b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨  b^{11, 88}_2
c    -b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_1
c    -b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨  b^{11, 88}_0
c  in DIMACS:
-11645 -11646  11647 -957  11648 0
-11645 -11646  11647 -957 -11649 0
-11645 -11646  11647 -957  11650 0

c  -1+1 --> 0
c    ( b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0 ∧  p_957) -> (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧ -b^{11, 88}_0)
c  in CNF:
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_2
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_1
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_0
c  in DIMACS:
-11645  11646 -11647 -957 -11648 0
-11645  11646 -11647 -957 -11649 0
-11645  11646 -11647 -957 -11650 0

c  0+1 --> 1
c    (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧  p_957) -> (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0)
c  in CNF:
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_2
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_1
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨  b^{11, 88}_0
c  in DIMACS:
 11645  11646  11647 -957 -11648 0
 11645  11646  11647 -957 -11649 0
 11645  11646  11647 -957  11650 0

c  1+1 --> 2
c    (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0 ∧  p_957) -> (-b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0)
c  in CNF:
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_2
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨  b^{11, 88}_1
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ -p_957 ∨ -b^{11, 88}_0
c  in DIMACS:
 11645  11646 -11647 -957 -11648 0
 11645  11646 -11647 -957  11649 0
 11645  11646 -11647 -957 -11650 0

c  2+1 --> break 
c    (-b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧  p_957) -> break
c  in CNF:
c     b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 11645 -11646  11647 -957 1162 0


c  2-1 --> 1
c    (-b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧ -p_957) -> (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0)
c  in CNF:
c     b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_2
c     b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_1
c     b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨  b^{11, 88}_0
c  in DIMACS:
 11645 -11646  11647  957 -11648 0
 11645 -11646  11647  957 -11649 0
 11645 -11646  11647  957  11650 0

c  1-1 --> 0
c    (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0 ∧ -p_957) -> (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧ -b^{11, 88}_0)
c  in CNF:
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_2
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_1
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_0
c  in DIMACS:
 11645  11646 -11647  957 -11648 0
 11645  11646 -11647  957 -11649 0
 11645  11646 -11647  957 -11650 0

c  0-1 --> -1
c    (-b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧ -p_957) -> ( b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0)
c  in CNF:
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨  b^{11, 88}_2
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_1
c     b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨  b^{11, 88}_0
c  in DIMACS:
 11645  11646  11647  957  11648 0
 11645  11646  11647  957 -11649 0
 11645  11646  11647  957  11650 0

c  -1-1 --> -2
c    ( b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧  b^{11, 87}_0 ∧ -p_957) -> ( b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0)
c  in CNF:
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨  b^{11, 88}_2
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨  b^{11, 88}_1
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨  p_957 ∨ -b^{11, 88}_0
c  in DIMACS:
-11645  11646 -11647  957  11648 0
-11645  11646 -11647  957  11649 0
-11645  11646 -11647  957 -11650 0

c  -2-1 --> break 
c    ( b^{11, 87}_2 ∧  b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨  b^{11, 87}_0 ∨  p_957 ∨ break
c  in DIMACS:
-11645 -11646  11647  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 87}_2 ∧ -b^{11, 87}_1 ∧ -b^{11, 87}_0 ∧ true) 
c  in CNF:
c    -b^{11, 87}_2 ∨  b^{11, 87}_1 ∨  b^{11, 87}_0 ∨ false 
c  in DIMACS:
-11645  11646  11647  0

c  3 does not represent an automaton state.
c    -(-b^{11, 87}_2 ∧  b^{11, 87}_1 ∧  b^{11, 87}_0 ∧ true) 
c  in CNF:
c     b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ false 
c  in DIMACS:
 11645 -11646 -11647  0
c  -3 does not represent an automaton state.
c    -( b^{11, 87}_2 ∧  b^{11, 87}_1 ∧  b^{11, 87}_0 ∧ true) 
c  in CNF:
c    -b^{11, 87}_2 ∨ -b^{11, 87}_1 ∨ -b^{11, 87}_0 ∨ false 
c  in DIMACS:
-11645 -11646 -11647  0

c i = 88
c  -2+1 --> -1
c    ( b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧  p_968) -> ( b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0)
c  in CNF:
c    -b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨  b^{11, 89}_2
c    -b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_1
c    -b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨  b^{11, 89}_0
c  in DIMACS:
-11648 -11649  11650 -968  11651 0
-11648 -11649  11650 -968 -11652 0
-11648 -11649  11650 -968  11653 0

c  -1+1 --> 0
c    ( b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0 ∧  p_968) -> (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧ -b^{11, 89}_0)
c  in CNF:
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_2
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_1
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_0
c  in DIMACS:
-11648  11649 -11650 -968 -11651 0
-11648  11649 -11650 -968 -11652 0
-11648  11649 -11650 -968 -11653 0

c  0+1 --> 1
c    (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧  p_968) -> (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0)
c  in CNF:
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_2
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_1
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨  b^{11, 89}_0
c  in DIMACS:
 11648  11649  11650 -968 -11651 0
 11648  11649  11650 -968 -11652 0
 11648  11649  11650 -968  11653 0

c  1+1 --> 2
c    (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0 ∧  p_968) -> (-b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0)
c  in CNF:
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_2
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨  b^{11, 89}_1
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ -p_968 ∨ -b^{11, 89}_0
c  in DIMACS:
 11648  11649 -11650 -968 -11651 0
 11648  11649 -11650 -968  11652 0
 11648  11649 -11650 -968 -11653 0

c  2+1 --> break 
c    (-b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧  p_968) -> break
c  in CNF:
c     b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 11648 -11649  11650 -968 1162 0


c  2-1 --> 1
c    (-b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧ -p_968) -> (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0)
c  in CNF:
c     b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_2
c     b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_1
c     b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨  b^{11, 89}_0
c  in DIMACS:
 11648 -11649  11650  968 -11651 0
 11648 -11649  11650  968 -11652 0
 11648 -11649  11650  968  11653 0

c  1-1 --> 0
c    (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0 ∧ -p_968) -> (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧ -b^{11, 89}_0)
c  in CNF:
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_2
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_1
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_0
c  in DIMACS:
 11648  11649 -11650  968 -11651 0
 11648  11649 -11650  968 -11652 0
 11648  11649 -11650  968 -11653 0

c  0-1 --> -1
c    (-b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧ -p_968) -> ( b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0)
c  in CNF:
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨  b^{11, 89}_2
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_1
c     b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨  b^{11, 89}_0
c  in DIMACS:
 11648  11649  11650  968  11651 0
 11648  11649  11650  968 -11652 0
 11648  11649  11650  968  11653 0

c  -1-1 --> -2
c    ( b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧  b^{11, 88}_0 ∧ -p_968) -> ( b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0)
c  in CNF:
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨  b^{11, 89}_2
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨  b^{11, 89}_1
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨  p_968 ∨ -b^{11, 89}_0
c  in DIMACS:
-11648  11649 -11650  968  11651 0
-11648  11649 -11650  968  11652 0
-11648  11649 -11650  968 -11653 0

c  -2-1 --> break 
c    ( b^{11, 88}_2 ∧  b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨  b^{11, 88}_0 ∨  p_968 ∨ break
c  in DIMACS:
-11648 -11649  11650  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 88}_2 ∧ -b^{11, 88}_1 ∧ -b^{11, 88}_0 ∧ true) 
c  in CNF:
c    -b^{11, 88}_2 ∨  b^{11, 88}_1 ∨  b^{11, 88}_0 ∨ false 
c  in DIMACS:
-11648  11649  11650  0

c  3 does not represent an automaton state.
c    -(-b^{11, 88}_2 ∧  b^{11, 88}_1 ∧  b^{11, 88}_0 ∧ true) 
c  in CNF:
c     b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ false 
c  in DIMACS:
 11648 -11649 -11650  0
c  -3 does not represent an automaton state.
c    -( b^{11, 88}_2 ∧  b^{11, 88}_1 ∧  b^{11, 88}_0 ∧ true) 
c  in CNF:
c    -b^{11, 88}_2 ∨ -b^{11, 88}_1 ∨ -b^{11, 88}_0 ∨ false 
c  in DIMACS:
-11648 -11649 -11650  0

c i = 89
c  -2+1 --> -1
c    ( b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧  p_979) -> ( b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0)
c  in CNF:
c    -b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨  b^{11, 90}_2
c    -b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_1
c    -b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨  b^{11, 90}_0
c  in DIMACS:
-11651 -11652  11653 -979  11654 0
-11651 -11652  11653 -979 -11655 0
-11651 -11652  11653 -979  11656 0

c  -1+1 --> 0
c    ( b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0 ∧  p_979) -> (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧ -b^{11, 90}_0)
c  in CNF:
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_2
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_1
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_0
c  in DIMACS:
-11651  11652 -11653 -979 -11654 0
-11651  11652 -11653 -979 -11655 0
-11651  11652 -11653 -979 -11656 0

c  0+1 --> 1
c    (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧  p_979) -> (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0)
c  in CNF:
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_2
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_1
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨  b^{11, 90}_0
c  in DIMACS:
 11651  11652  11653 -979 -11654 0
 11651  11652  11653 -979 -11655 0
 11651  11652  11653 -979  11656 0

c  1+1 --> 2
c    (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0 ∧  p_979) -> (-b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0)
c  in CNF:
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_2
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨  b^{11, 90}_1
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ -p_979 ∨ -b^{11, 90}_0
c  in DIMACS:
 11651  11652 -11653 -979 -11654 0
 11651  11652 -11653 -979  11655 0
 11651  11652 -11653 -979 -11656 0

c  2+1 --> break 
c    (-b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧  p_979) -> break
c  in CNF:
c     b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ -p_979 ∨ break
c  in DIMACS:
 11651 -11652  11653 -979 1162 0


c  2-1 --> 1
c    (-b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧ -p_979) -> (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0)
c  in CNF:
c     b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_2
c     b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_1
c     b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨  b^{11, 90}_0
c  in DIMACS:
 11651 -11652  11653  979 -11654 0
 11651 -11652  11653  979 -11655 0
 11651 -11652  11653  979  11656 0

c  1-1 --> 0
c    (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0 ∧ -p_979) -> (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧ -b^{11, 90}_0)
c  in CNF:
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_2
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_1
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_0
c  in DIMACS:
 11651  11652 -11653  979 -11654 0
 11651  11652 -11653  979 -11655 0
 11651  11652 -11653  979 -11656 0

c  0-1 --> -1
c    (-b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧ -p_979) -> ( b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0)
c  in CNF:
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨  b^{11, 90}_2
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_1
c     b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨  b^{11, 90}_0
c  in DIMACS:
 11651  11652  11653  979  11654 0
 11651  11652  11653  979 -11655 0
 11651  11652  11653  979  11656 0

c  -1-1 --> -2
c    ( b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧  b^{11, 89}_0 ∧ -p_979) -> ( b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0)
c  in CNF:
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨  b^{11, 90}_2
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨  b^{11, 90}_1
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨  p_979 ∨ -b^{11, 90}_0
c  in DIMACS:
-11651  11652 -11653  979  11654 0
-11651  11652 -11653  979  11655 0
-11651  11652 -11653  979 -11656 0

c  -2-1 --> break 
c    ( b^{11, 89}_2 ∧  b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧ -p_979) -> break
c  in CNF:
c    -b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨  b^{11, 89}_0 ∨  p_979 ∨ break
c  in DIMACS:
-11651 -11652  11653  979 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 89}_2 ∧ -b^{11, 89}_1 ∧ -b^{11, 89}_0 ∧ true) 
c  in CNF:
c    -b^{11, 89}_2 ∨  b^{11, 89}_1 ∨  b^{11, 89}_0 ∨ false 
c  in DIMACS:
-11651  11652  11653  0

c  3 does not represent an automaton state.
c    -(-b^{11, 89}_2 ∧  b^{11, 89}_1 ∧  b^{11, 89}_0 ∧ true) 
c  in CNF:
c     b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ false 
c  in DIMACS:
 11651 -11652 -11653  0
c  -3 does not represent an automaton state.
c    -( b^{11, 89}_2 ∧  b^{11, 89}_1 ∧  b^{11, 89}_0 ∧ true) 
c  in CNF:
c    -b^{11, 89}_2 ∨ -b^{11, 89}_1 ∨ -b^{11, 89}_0 ∨ false 
c  in DIMACS:
-11651 -11652 -11653  0

c i = 90
c  -2+1 --> -1
c    ( b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧  p_990) -> ( b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0)
c  in CNF:
c    -b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨  b^{11, 91}_2
c    -b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_1
c    -b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨  b^{11, 91}_0
c  in DIMACS:
-11654 -11655  11656 -990  11657 0
-11654 -11655  11656 -990 -11658 0
-11654 -11655  11656 -990  11659 0

c  -1+1 --> 0
c    ( b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0 ∧  p_990) -> (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧ -b^{11, 91}_0)
c  in CNF:
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_2
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_1
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_0
c  in DIMACS:
-11654  11655 -11656 -990 -11657 0
-11654  11655 -11656 -990 -11658 0
-11654  11655 -11656 -990 -11659 0

c  0+1 --> 1
c    (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧  p_990) -> (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0)
c  in CNF:
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_2
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_1
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨  b^{11, 91}_0
c  in DIMACS:
 11654  11655  11656 -990 -11657 0
 11654  11655  11656 -990 -11658 0
 11654  11655  11656 -990  11659 0

c  1+1 --> 2
c    (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0 ∧  p_990) -> (-b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0)
c  in CNF:
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_2
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨  b^{11, 91}_1
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ -p_990 ∨ -b^{11, 91}_0
c  in DIMACS:
 11654  11655 -11656 -990 -11657 0
 11654  11655 -11656 -990  11658 0
 11654  11655 -11656 -990 -11659 0

c  2+1 --> break 
c    (-b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧  p_990) -> break
c  in CNF:
c     b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 11654 -11655  11656 -990 1162 0


c  2-1 --> 1
c    (-b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧ -p_990) -> (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0)
c  in CNF:
c     b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_2
c     b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_1
c     b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨  b^{11, 91}_0
c  in DIMACS:
 11654 -11655  11656  990 -11657 0
 11654 -11655  11656  990 -11658 0
 11654 -11655  11656  990  11659 0

c  1-1 --> 0
c    (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0 ∧ -p_990) -> (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧ -b^{11, 91}_0)
c  in CNF:
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_2
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_1
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_0
c  in DIMACS:
 11654  11655 -11656  990 -11657 0
 11654  11655 -11656  990 -11658 0
 11654  11655 -11656  990 -11659 0

c  0-1 --> -1
c    (-b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧ -p_990) -> ( b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0)
c  in CNF:
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨  b^{11, 91}_2
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_1
c     b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨  b^{11, 91}_0
c  in DIMACS:
 11654  11655  11656  990  11657 0
 11654  11655  11656  990 -11658 0
 11654  11655  11656  990  11659 0

c  -1-1 --> -2
c    ( b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧  b^{11, 90}_0 ∧ -p_990) -> ( b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0)
c  in CNF:
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨  b^{11, 91}_2
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨  b^{11, 91}_1
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨  p_990 ∨ -b^{11, 91}_0
c  in DIMACS:
-11654  11655 -11656  990  11657 0
-11654  11655 -11656  990  11658 0
-11654  11655 -11656  990 -11659 0

c  -2-1 --> break 
c    ( b^{11, 90}_2 ∧  b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨  b^{11, 90}_0 ∨  p_990 ∨ break
c  in DIMACS:
-11654 -11655  11656  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 90}_2 ∧ -b^{11, 90}_1 ∧ -b^{11, 90}_0 ∧ true) 
c  in CNF:
c    -b^{11, 90}_2 ∨  b^{11, 90}_1 ∨  b^{11, 90}_0 ∨ false 
c  in DIMACS:
-11654  11655  11656  0

c  3 does not represent an automaton state.
c    -(-b^{11, 90}_2 ∧  b^{11, 90}_1 ∧  b^{11, 90}_0 ∧ true) 
c  in CNF:
c     b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ false 
c  in DIMACS:
 11654 -11655 -11656  0
c  -3 does not represent an automaton state.
c    -( b^{11, 90}_2 ∧  b^{11, 90}_1 ∧  b^{11, 90}_0 ∧ true) 
c  in CNF:
c    -b^{11, 90}_2 ∨ -b^{11, 90}_1 ∨ -b^{11, 90}_0 ∨ false 
c  in DIMACS:
-11654 -11655 -11656  0

c i = 91
c  -2+1 --> -1
c    ( b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧  p_1001) -> ( b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0)
c  in CNF:
c    -b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨  b^{11, 92}_2
c    -b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_1
c    -b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨  b^{11, 92}_0
c  in DIMACS:
-11657 -11658  11659 -1001  11660 0
-11657 -11658  11659 -1001 -11661 0
-11657 -11658  11659 -1001  11662 0

c  -1+1 --> 0
c    ( b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0 ∧  p_1001) -> (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧ -b^{11, 92}_0)
c  in CNF:
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_2
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_1
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_0
c  in DIMACS:
-11657  11658 -11659 -1001 -11660 0
-11657  11658 -11659 -1001 -11661 0
-11657  11658 -11659 -1001 -11662 0

c  0+1 --> 1
c    (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧  p_1001) -> (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0)
c  in CNF:
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_2
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_1
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨  b^{11, 92}_0
c  in DIMACS:
 11657  11658  11659 -1001 -11660 0
 11657  11658  11659 -1001 -11661 0
 11657  11658  11659 -1001  11662 0

c  1+1 --> 2
c    (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0 ∧  p_1001) -> (-b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0)
c  in CNF:
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_2
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨  b^{11, 92}_1
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ -p_1001 ∨ -b^{11, 92}_0
c  in DIMACS:
 11657  11658 -11659 -1001 -11660 0
 11657  11658 -11659 -1001  11661 0
 11657  11658 -11659 -1001 -11662 0

c  2+1 --> break 
c    (-b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 11657 -11658  11659 -1001 1162 0


c  2-1 --> 1
c    (-b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧ -p_1001) -> (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0)
c  in CNF:
c     b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_2
c     b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_1
c     b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨  b^{11, 92}_0
c  in DIMACS:
 11657 -11658  11659  1001 -11660 0
 11657 -11658  11659  1001 -11661 0
 11657 -11658  11659  1001  11662 0

c  1-1 --> 0
c    (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0 ∧ -p_1001) -> (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧ -b^{11, 92}_0)
c  in CNF:
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_2
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_1
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_0
c  in DIMACS:
 11657  11658 -11659  1001 -11660 0
 11657  11658 -11659  1001 -11661 0
 11657  11658 -11659  1001 -11662 0

c  0-1 --> -1
c    (-b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧ -p_1001) -> ( b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0)
c  in CNF:
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨  b^{11, 92}_2
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_1
c     b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨  b^{11, 92}_0
c  in DIMACS:
 11657  11658  11659  1001  11660 0
 11657  11658  11659  1001 -11661 0
 11657  11658  11659  1001  11662 0

c  -1-1 --> -2
c    ( b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧  b^{11, 91}_0 ∧ -p_1001) -> ( b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0)
c  in CNF:
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨  b^{11, 92}_2
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨  b^{11, 92}_1
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨  p_1001 ∨ -b^{11, 92}_0
c  in DIMACS:
-11657  11658 -11659  1001  11660 0
-11657  11658 -11659  1001  11661 0
-11657  11658 -11659  1001 -11662 0

c  -2-1 --> break 
c    ( b^{11, 91}_2 ∧  b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨  b^{11, 91}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-11657 -11658  11659  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 91}_2 ∧ -b^{11, 91}_1 ∧ -b^{11, 91}_0 ∧ true) 
c  in CNF:
c    -b^{11, 91}_2 ∨  b^{11, 91}_1 ∨  b^{11, 91}_0 ∨ false 
c  in DIMACS:
-11657  11658  11659  0

c  3 does not represent an automaton state.
c    -(-b^{11, 91}_2 ∧  b^{11, 91}_1 ∧  b^{11, 91}_0 ∧ true) 
c  in CNF:
c     b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ false 
c  in DIMACS:
 11657 -11658 -11659  0
c  -3 does not represent an automaton state.
c    -( b^{11, 91}_2 ∧  b^{11, 91}_1 ∧  b^{11, 91}_0 ∧ true) 
c  in CNF:
c    -b^{11, 91}_2 ∨ -b^{11, 91}_1 ∨ -b^{11, 91}_0 ∨ false 
c  in DIMACS:
-11657 -11658 -11659  0

c i = 92
c  -2+1 --> -1
c    ( b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧  p_1012) -> ( b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0)
c  in CNF:
c    -b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨  b^{11, 93}_2
c    -b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_1
c    -b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨  b^{11, 93}_0
c  in DIMACS:
-11660 -11661  11662 -1012  11663 0
-11660 -11661  11662 -1012 -11664 0
-11660 -11661  11662 -1012  11665 0

c  -1+1 --> 0
c    ( b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0 ∧  p_1012) -> (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧ -b^{11, 93}_0)
c  in CNF:
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_2
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_1
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_0
c  in DIMACS:
-11660  11661 -11662 -1012 -11663 0
-11660  11661 -11662 -1012 -11664 0
-11660  11661 -11662 -1012 -11665 0

c  0+1 --> 1
c    (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧  p_1012) -> (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0)
c  in CNF:
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_2
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_1
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨  b^{11, 93}_0
c  in DIMACS:
 11660  11661  11662 -1012 -11663 0
 11660  11661  11662 -1012 -11664 0
 11660  11661  11662 -1012  11665 0

c  1+1 --> 2
c    (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0 ∧  p_1012) -> (-b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0)
c  in CNF:
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_2
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨  b^{11, 93}_1
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ -p_1012 ∨ -b^{11, 93}_0
c  in DIMACS:
 11660  11661 -11662 -1012 -11663 0
 11660  11661 -11662 -1012  11664 0
 11660  11661 -11662 -1012 -11665 0

c  2+1 --> break 
c    (-b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 11660 -11661  11662 -1012 1162 0


c  2-1 --> 1
c    (-b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧ -p_1012) -> (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0)
c  in CNF:
c     b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_2
c     b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_1
c     b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨  b^{11, 93}_0
c  in DIMACS:
 11660 -11661  11662  1012 -11663 0
 11660 -11661  11662  1012 -11664 0
 11660 -11661  11662  1012  11665 0

c  1-1 --> 0
c    (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0 ∧ -p_1012) -> (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧ -b^{11, 93}_0)
c  in CNF:
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_2
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_1
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_0
c  in DIMACS:
 11660  11661 -11662  1012 -11663 0
 11660  11661 -11662  1012 -11664 0
 11660  11661 -11662  1012 -11665 0

c  0-1 --> -1
c    (-b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧ -p_1012) -> ( b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0)
c  in CNF:
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨  b^{11, 93}_2
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_1
c     b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨  b^{11, 93}_0
c  in DIMACS:
 11660  11661  11662  1012  11663 0
 11660  11661  11662  1012 -11664 0
 11660  11661  11662  1012  11665 0

c  -1-1 --> -2
c    ( b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧  b^{11, 92}_0 ∧ -p_1012) -> ( b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0)
c  in CNF:
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨  b^{11, 93}_2
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨  b^{11, 93}_1
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨  p_1012 ∨ -b^{11, 93}_0
c  in DIMACS:
-11660  11661 -11662  1012  11663 0
-11660  11661 -11662  1012  11664 0
-11660  11661 -11662  1012 -11665 0

c  -2-1 --> break 
c    ( b^{11, 92}_2 ∧  b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨  b^{11, 92}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-11660 -11661  11662  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 92}_2 ∧ -b^{11, 92}_1 ∧ -b^{11, 92}_0 ∧ true) 
c  in CNF:
c    -b^{11, 92}_2 ∨  b^{11, 92}_1 ∨  b^{11, 92}_0 ∨ false 
c  in DIMACS:
-11660  11661  11662  0

c  3 does not represent an automaton state.
c    -(-b^{11, 92}_2 ∧  b^{11, 92}_1 ∧  b^{11, 92}_0 ∧ true) 
c  in CNF:
c     b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ false 
c  in DIMACS:
 11660 -11661 -11662  0
c  -3 does not represent an automaton state.
c    -( b^{11, 92}_2 ∧  b^{11, 92}_1 ∧  b^{11, 92}_0 ∧ true) 
c  in CNF:
c    -b^{11, 92}_2 ∨ -b^{11, 92}_1 ∨ -b^{11, 92}_0 ∨ false 
c  in DIMACS:
-11660 -11661 -11662  0

c i = 93
c  -2+1 --> -1
c    ( b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧  p_1023) -> ( b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0)
c  in CNF:
c    -b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨  b^{11, 94}_2
c    -b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_1
c    -b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨  b^{11, 94}_0
c  in DIMACS:
-11663 -11664  11665 -1023  11666 0
-11663 -11664  11665 -1023 -11667 0
-11663 -11664  11665 -1023  11668 0

c  -1+1 --> 0
c    ( b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0 ∧  p_1023) -> (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧ -b^{11, 94}_0)
c  in CNF:
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_2
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_1
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_0
c  in DIMACS:
-11663  11664 -11665 -1023 -11666 0
-11663  11664 -11665 -1023 -11667 0
-11663  11664 -11665 -1023 -11668 0

c  0+1 --> 1
c    (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧  p_1023) -> (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0)
c  in CNF:
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_2
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_1
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨  b^{11, 94}_0
c  in DIMACS:
 11663  11664  11665 -1023 -11666 0
 11663  11664  11665 -1023 -11667 0
 11663  11664  11665 -1023  11668 0

c  1+1 --> 2
c    (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0 ∧  p_1023) -> (-b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0)
c  in CNF:
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_2
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨  b^{11, 94}_1
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ -p_1023 ∨ -b^{11, 94}_0
c  in DIMACS:
 11663  11664 -11665 -1023 -11666 0
 11663  11664 -11665 -1023  11667 0
 11663  11664 -11665 -1023 -11668 0

c  2+1 --> break 
c    (-b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 11663 -11664  11665 -1023 1162 0


c  2-1 --> 1
c    (-b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧ -p_1023) -> (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0)
c  in CNF:
c     b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_2
c     b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_1
c     b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨  b^{11, 94}_0
c  in DIMACS:
 11663 -11664  11665  1023 -11666 0
 11663 -11664  11665  1023 -11667 0
 11663 -11664  11665  1023  11668 0

c  1-1 --> 0
c    (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0 ∧ -p_1023) -> (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧ -b^{11, 94}_0)
c  in CNF:
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_2
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_1
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_0
c  in DIMACS:
 11663  11664 -11665  1023 -11666 0
 11663  11664 -11665  1023 -11667 0
 11663  11664 -11665  1023 -11668 0

c  0-1 --> -1
c    (-b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧ -p_1023) -> ( b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0)
c  in CNF:
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨  b^{11, 94}_2
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_1
c     b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨  b^{11, 94}_0
c  in DIMACS:
 11663  11664  11665  1023  11666 0
 11663  11664  11665  1023 -11667 0
 11663  11664  11665  1023  11668 0

c  -1-1 --> -2
c    ( b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧  b^{11, 93}_0 ∧ -p_1023) -> ( b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0)
c  in CNF:
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨  b^{11, 94}_2
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨  b^{11, 94}_1
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨  p_1023 ∨ -b^{11, 94}_0
c  in DIMACS:
-11663  11664 -11665  1023  11666 0
-11663  11664 -11665  1023  11667 0
-11663  11664 -11665  1023 -11668 0

c  -2-1 --> break 
c    ( b^{11, 93}_2 ∧  b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨  b^{11, 93}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-11663 -11664  11665  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 93}_2 ∧ -b^{11, 93}_1 ∧ -b^{11, 93}_0 ∧ true) 
c  in CNF:
c    -b^{11, 93}_2 ∨  b^{11, 93}_1 ∨  b^{11, 93}_0 ∨ false 
c  in DIMACS:
-11663  11664  11665  0

c  3 does not represent an automaton state.
c    -(-b^{11, 93}_2 ∧  b^{11, 93}_1 ∧  b^{11, 93}_0 ∧ true) 
c  in CNF:
c     b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ false 
c  in DIMACS:
 11663 -11664 -11665  0
c  -3 does not represent an automaton state.
c    -( b^{11, 93}_2 ∧  b^{11, 93}_1 ∧  b^{11, 93}_0 ∧ true) 
c  in CNF:
c    -b^{11, 93}_2 ∨ -b^{11, 93}_1 ∨ -b^{11, 93}_0 ∨ false 
c  in DIMACS:
-11663 -11664 -11665  0

c i = 94
c  -2+1 --> -1
c    ( b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧  p_1034) -> ( b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0)
c  in CNF:
c    -b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨  b^{11, 95}_2
c    -b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_1
c    -b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨  b^{11, 95}_0
c  in DIMACS:
-11666 -11667  11668 -1034  11669 0
-11666 -11667  11668 -1034 -11670 0
-11666 -11667  11668 -1034  11671 0

c  -1+1 --> 0
c    ( b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0 ∧  p_1034) -> (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧ -b^{11, 95}_0)
c  in CNF:
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_2
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_1
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_0
c  in DIMACS:
-11666  11667 -11668 -1034 -11669 0
-11666  11667 -11668 -1034 -11670 0
-11666  11667 -11668 -1034 -11671 0

c  0+1 --> 1
c    (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧  p_1034) -> (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0)
c  in CNF:
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_2
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_1
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨  b^{11, 95}_0
c  in DIMACS:
 11666  11667  11668 -1034 -11669 0
 11666  11667  11668 -1034 -11670 0
 11666  11667  11668 -1034  11671 0

c  1+1 --> 2
c    (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0 ∧  p_1034) -> (-b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0)
c  in CNF:
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_2
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨  b^{11, 95}_1
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ -p_1034 ∨ -b^{11, 95}_0
c  in DIMACS:
 11666  11667 -11668 -1034 -11669 0
 11666  11667 -11668 -1034  11670 0
 11666  11667 -11668 -1034 -11671 0

c  2+1 --> break 
c    (-b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 11666 -11667  11668 -1034 1162 0


c  2-1 --> 1
c    (-b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧ -p_1034) -> (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0)
c  in CNF:
c     b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_2
c     b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_1
c     b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨  b^{11, 95}_0
c  in DIMACS:
 11666 -11667  11668  1034 -11669 0
 11666 -11667  11668  1034 -11670 0
 11666 -11667  11668  1034  11671 0

c  1-1 --> 0
c    (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0 ∧ -p_1034) -> (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧ -b^{11, 95}_0)
c  in CNF:
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_2
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_1
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_0
c  in DIMACS:
 11666  11667 -11668  1034 -11669 0
 11666  11667 -11668  1034 -11670 0
 11666  11667 -11668  1034 -11671 0

c  0-1 --> -1
c    (-b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧ -p_1034) -> ( b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0)
c  in CNF:
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨  b^{11, 95}_2
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_1
c     b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨  b^{11, 95}_0
c  in DIMACS:
 11666  11667  11668  1034  11669 0
 11666  11667  11668  1034 -11670 0
 11666  11667  11668  1034  11671 0

c  -1-1 --> -2
c    ( b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧  b^{11, 94}_0 ∧ -p_1034) -> ( b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0)
c  in CNF:
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨  b^{11, 95}_2
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨  b^{11, 95}_1
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨  p_1034 ∨ -b^{11, 95}_0
c  in DIMACS:
-11666  11667 -11668  1034  11669 0
-11666  11667 -11668  1034  11670 0
-11666  11667 -11668  1034 -11671 0

c  -2-1 --> break 
c    ( b^{11, 94}_2 ∧  b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨  b^{11, 94}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-11666 -11667  11668  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 94}_2 ∧ -b^{11, 94}_1 ∧ -b^{11, 94}_0 ∧ true) 
c  in CNF:
c    -b^{11, 94}_2 ∨  b^{11, 94}_1 ∨  b^{11, 94}_0 ∨ false 
c  in DIMACS:
-11666  11667  11668  0

c  3 does not represent an automaton state.
c    -(-b^{11, 94}_2 ∧  b^{11, 94}_1 ∧  b^{11, 94}_0 ∧ true) 
c  in CNF:
c     b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ false 
c  in DIMACS:
 11666 -11667 -11668  0
c  -3 does not represent an automaton state.
c    -( b^{11, 94}_2 ∧  b^{11, 94}_1 ∧  b^{11, 94}_0 ∧ true) 
c  in CNF:
c    -b^{11, 94}_2 ∨ -b^{11, 94}_1 ∨ -b^{11, 94}_0 ∨ false 
c  in DIMACS:
-11666 -11667 -11668  0

c i = 95
c  -2+1 --> -1
c    ( b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧  p_1045) -> ( b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0)
c  in CNF:
c    -b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨  b^{11, 96}_2
c    -b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_1
c    -b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨  b^{11, 96}_0
c  in DIMACS:
-11669 -11670  11671 -1045  11672 0
-11669 -11670  11671 -1045 -11673 0
-11669 -11670  11671 -1045  11674 0

c  -1+1 --> 0
c    ( b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0 ∧  p_1045) -> (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧ -b^{11, 96}_0)
c  in CNF:
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_2
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_1
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_0
c  in DIMACS:
-11669  11670 -11671 -1045 -11672 0
-11669  11670 -11671 -1045 -11673 0
-11669  11670 -11671 -1045 -11674 0

c  0+1 --> 1
c    (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧  p_1045) -> (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0)
c  in CNF:
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_2
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_1
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨  b^{11, 96}_0
c  in DIMACS:
 11669  11670  11671 -1045 -11672 0
 11669  11670  11671 -1045 -11673 0
 11669  11670  11671 -1045  11674 0

c  1+1 --> 2
c    (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0 ∧  p_1045) -> (-b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0)
c  in CNF:
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_2
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨  b^{11, 96}_1
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ -p_1045 ∨ -b^{11, 96}_0
c  in DIMACS:
 11669  11670 -11671 -1045 -11672 0
 11669  11670 -11671 -1045  11673 0
 11669  11670 -11671 -1045 -11674 0

c  2+1 --> break 
c    (-b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 11669 -11670  11671 -1045 1162 0


c  2-1 --> 1
c    (-b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧ -p_1045) -> (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0)
c  in CNF:
c     b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_2
c     b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_1
c     b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨  b^{11, 96}_0
c  in DIMACS:
 11669 -11670  11671  1045 -11672 0
 11669 -11670  11671  1045 -11673 0
 11669 -11670  11671  1045  11674 0

c  1-1 --> 0
c    (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0 ∧ -p_1045) -> (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧ -b^{11, 96}_0)
c  in CNF:
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_2
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_1
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_0
c  in DIMACS:
 11669  11670 -11671  1045 -11672 0
 11669  11670 -11671  1045 -11673 0
 11669  11670 -11671  1045 -11674 0

c  0-1 --> -1
c    (-b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧ -p_1045) -> ( b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0)
c  in CNF:
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨  b^{11, 96}_2
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_1
c     b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨  b^{11, 96}_0
c  in DIMACS:
 11669  11670  11671  1045  11672 0
 11669  11670  11671  1045 -11673 0
 11669  11670  11671  1045  11674 0

c  -1-1 --> -2
c    ( b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧  b^{11, 95}_0 ∧ -p_1045) -> ( b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0)
c  in CNF:
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨  b^{11, 96}_2
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨  b^{11, 96}_1
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨  p_1045 ∨ -b^{11, 96}_0
c  in DIMACS:
-11669  11670 -11671  1045  11672 0
-11669  11670 -11671  1045  11673 0
-11669  11670 -11671  1045 -11674 0

c  -2-1 --> break 
c    ( b^{11, 95}_2 ∧  b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨  b^{11, 95}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-11669 -11670  11671  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 95}_2 ∧ -b^{11, 95}_1 ∧ -b^{11, 95}_0 ∧ true) 
c  in CNF:
c    -b^{11, 95}_2 ∨  b^{11, 95}_1 ∨  b^{11, 95}_0 ∨ false 
c  in DIMACS:
-11669  11670  11671  0

c  3 does not represent an automaton state.
c    -(-b^{11, 95}_2 ∧  b^{11, 95}_1 ∧  b^{11, 95}_0 ∧ true) 
c  in CNF:
c     b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ false 
c  in DIMACS:
 11669 -11670 -11671  0
c  -3 does not represent an automaton state.
c    -( b^{11, 95}_2 ∧  b^{11, 95}_1 ∧  b^{11, 95}_0 ∧ true) 
c  in CNF:
c    -b^{11, 95}_2 ∨ -b^{11, 95}_1 ∨ -b^{11, 95}_0 ∨ false 
c  in DIMACS:
-11669 -11670 -11671  0

c i = 96
c  -2+1 --> -1
c    ( b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧  p_1056) -> ( b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0)
c  in CNF:
c    -b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨  b^{11, 97}_2
c    -b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_1
c    -b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨  b^{11, 97}_0
c  in DIMACS:
-11672 -11673  11674 -1056  11675 0
-11672 -11673  11674 -1056 -11676 0
-11672 -11673  11674 -1056  11677 0

c  -1+1 --> 0
c    ( b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0 ∧  p_1056) -> (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧ -b^{11, 97}_0)
c  in CNF:
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_2
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_1
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_0
c  in DIMACS:
-11672  11673 -11674 -1056 -11675 0
-11672  11673 -11674 -1056 -11676 0
-11672  11673 -11674 -1056 -11677 0

c  0+1 --> 1
c    (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧  p_1056) -> (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0)
c  in CNF:
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_2
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_1
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨  b^{11, 97}_0
c  in DIMACS:
 11672  11673  11674 -1056 -11675 0
 11672  11673  11674 -1056 -11676 0
 11672  11673  11674 -1056  11677 0

c  1+1 --> 2
c    (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0 ∧  p_1056) -> (-b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0)
c  in CNF:
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_2
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨  b^{11, 97}_1
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ -p_1056 ∨ -b^{11, 97}_0
c  in DIMACS:
 11672  11673 -11674 -1056 -11675 0
 11672  11673 -11674 -1056  11676 0
 11672  11673 -11674 -1056 -11677 0

c  2+1 --> break 
c    (-b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 11672 -11673  11674 -1056 1162 0


c  2-1 --> 1
c    (-b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧ -p_1056) -> (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0)
c  in CNF:
c     b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_2
c     b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_1
c     b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨  b^{11, 97}_0
c  in DIMACS:
 11672 -11673  11674  1056 -11675 0
 11672 -11673  11674  1056 -11676 0
 11672 -11673  11674  1056  11677 0

c  1-1 --> 0
c    (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0 ∧ -p_1056) -> (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧ -b^{11, 97}_0)
c  in CNF:
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_2
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_1
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_0
c  in DIMACS:
 11672  11673 -11674  1056 -11675 0
 11672  11673 -11674  1056 -11676 0
 11672  11673 -11674  1056 -11677 0

c  0-1 --> -1
c    (-b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧ -p_1056) -> ( b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0)
c  in CNF:
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨  b^{11, 97}_2
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_1
c     b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨  b^{11, 97}_0
c  in DIMACS:
 11672  11673  11674  1056  11675 0
 11672  11673  11674  1056 -11676 0
 11672  11673  11674  1056  11677 0

c  -1-1 --> -2
c    ( b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧  b^{11, 96}_0 ∧ -p_1056) -> ( b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0)
c  in CNF:
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨  b^{11, 97}_2
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨  b^{11, 97}_1
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨  p_1056 ∨ -b^{11, 97}_0
c  in DIMACS:
-11672  11673 -11674  1056  11675 0
-11672  11673 -11674  1056  11676 0
-11672  11673 -11674  1056 -11677 0

c  -2-1 --> break 
c    ( b^{11, 96}_2 ∧  b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨  b^{11, 96}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-11672 -11673  11674  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 96}_2 ∧ -b^{11, 96}_1 ∧ -b^{11, 96}_0 ∧ true) 
c  in CNF:
c    -b^{11, 96}_2 ∨  b^{11, 96}_1 ∨  b^{11, 96}_0 ∨ false 
c  in DIMACS:
-11672  11673  11674  0

c  3 does not represent an automaton state.
c    -(-b^{11, 96}_2 ∧  b^{11, 96}_1 ∧  b^{11, 96}_0 ∧ true) 
c  in CNF:
c     b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ false 
c  in DIMACS:
 11672 -11673 -11674  0
c  -3 does not represent an automaton state.
c    -( b^{11, 96}_2 ∧  b^{11, 96}_1 ∧  b^{11, 96}_0 ∧ true) 
c  in CNF:
c    -b^{11, 96}_2 ∨ -b^{11, 96}_1 ∨ -b^{11, 96}_0 ∨ false 
c  in DIMACS:
-11672 -11673 -11674  0

c i = 97
c  -2+1 --> -1
c    ( b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧  p_1067) -> ( b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0)
c  in CNF:
c    -b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨  b^{11, 98}_2
c    -b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_1
c    -b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨  b^{11, 98}_0
c  in DIMACS:
-11675 -11676  11677 -1067  11678 0
-11675 -11676  11677 -1067 -11679 0
-11675 -11676  11677 -1067  11680 0

c  -1+1 --> 0
c    ( b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0 ∧  p_1067) -> (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧ -b^{11, 98}_0)
c  in CNF:
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_2
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_1
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_0
c  in DIMACS:
-11675  11676 -11677 -1067 -11678 0
-11675  11676 -11677 -1067 -11679 0
-11675  11676 -11677 -1067 -11680 0

c  0+1 --> 1
c    (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧  p_1067) -> (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0)
c  in CNF:
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_2
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_1
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨  b^{11, 98}_0
c  in DIMACS:
 11675  11676  11677 -1067 -11678 0
 11675  11676  11677 -1067 -11679 0
 11675  11676  11677 -1067  11680 0

c  1+1 --> 2
c    (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0 ∧  p_1067) -> (-b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0)
c  in CNF:
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_2
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨  b^{11, 98}_1
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ -p_1067 ∨ -b^{11, 98}_0
c  in DIMACS:
 11675  11676 -11677 -1067 -11678 0
 11675  11676 -11677 -1067  11679 0
 11675  11676 -11677 -1067 -11680 0

c  2+1 --> break 
c    (-b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧  p_1067) -> break
c  in CNF:
c     b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ -p_1067 ∨ break
c  in DIMACS:
 11675 -11676  11677 -1067 1162 0


c  2-1 --> 1
c    (-b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧ -p_1067) -> (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0)
c  in CNF:
c     b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_2
c     b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_1
c     b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨  b^{11, 98}_0
c  in DIMACS:
 11675 -11676  11677  1067 -11678 0
 11675 -11676  11677  1067 -11679 0
 11675 -11676  11677  1067  11680 0

c  1-1 --> 0
c    (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0 ∧ -p_1067) -> (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧ -b^{11, 98}_0)
c  in CNF:
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_2
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_1
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_0
c  in DIMACS:
 11675  11676 -11677  1067 -11678 0
 11675  11676 -11677  1067 -11679 0
 11675  11676 -11677  1067 -11680 0

c  0-1 --> -1
c    (-b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧ -p_1067) -> ( b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0)
c  in CNF:
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨  b^{11, 98}_2
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_1
c     b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨  b^{11, 98}_0
c  in DIMACS:
 11675  11676  11677  1067  11678 0
 11675  11676  11677  1067 -11679 0
 11675  11676  11677  1067  11680 0

c  -1-1 --> -2
c    ( b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧  b^{11, 97}_0 ∧ -p_1067) -> ( b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0)
c  in CNF:
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨  b^{11, 98}_2
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨  b^{11, 98}_1
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨  p_1067 ∨ -b^{11, 98}_0
c  in DIMACS:
-11675  11676 -11677  1067  11678 0
-11675  11676 -11677  1067  11679 0
-11675  11676 -11677  1067 -11680 0

c  -2-1 --> break 
c    ( b^{11, 97}_2 ∧  b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧ -p_1067) -> break
c  in CNF:
c    -b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨  b^{11, 97}_0 ∨  p_1067 ∨ break
c  in DIMACS:
-11675 -11676  11677  1067 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 97}_2 ∧ -b^{11, 97}_1 ∧ -b^{11, 97}_0 ∧ true) 
c  in CNF:
c    -b^{11, 97}_2 ∨  b^{11, 97}_1 ∨  b^{11, 97}_0 ∨ false 
c  in DIMACS:
-11675  11676  11677  0

c  3 does not represent an automaton state.
c    -(-b^{11, 97}_2 ∧  b^{11, 97}_1 ∧  b^{11, 97}_0 ∧ true) 
c  in CNF:
c     b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ false 
c  in DIMACS:
 11675 -11676 -11677  0
c  -3 does not represent an automaton state.
c    -( b^{11, 97}_2 ∧  b^{11, 97}_1 ∧  b^{11, 97}_0 ∧ true) 
c  in CNF:
c    -b^{11, 97}_2 ∨ -b^{11, 97}_1 ∨ -b^{11, 97}_0 ∨ false 
c  in DIMACS:
-11675 -11676 -11677  0

c i = 98
c  -2+1 --> -1
c    ( b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧  p_1078) -> ( b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0)
c  in CNF:
c    -b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨  b^{11, 99}_2
c    -b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_1
c    -b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨  b^{11, 99}_0
c  in DIMACS:
-11678 -11679  11680 -1078  11681 0
-11678 -11679  11680 -1078 -11682 0
-11678 -11679  11680 -1078  11683 0

c  -1+1 --> 0
c    ( b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0 ∧  p_1078) -> (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧ -b^{11, 99}_0)
c  in CNF:
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_2
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_1
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_0
c  in DIMACS:
-11678  11679 -11680 -1078 -11681 0
-11678  11679 -11680 -1078 -11682 0
-11678  11679 -11680 -1078 -11683 0

c  0+1 --> 1
c    (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧  p_1078) -> (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0)
c  in CNF:
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_2
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_1
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨  b^{11, 99}_0
c  in DIMACS:
 11678  11679  11680 -1078 -11681 0
 11678  11679  11680 -1078 -11682 0
 11678  11679  11680 -1078  11683 0

c  1+1 --> 2
c    (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0 ∧  p_1078) -> (-b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0)
c  in CNF:
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_2
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨  b^{11, 99}_1
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ -p_1078 ∨ -b^{11, 99}_0
c  in DIMACS:
 11678  11679 -11680 -1078 -11681 0
 11678  11679 -11680 -1078  11682 0
 11678  11679 -11680 -1078 -11683 0

c  2+1 --> break 
c    (-b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 11678 -11679  11680 -1078 1162 0


c  2-1 --> 1
c    (-b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧ -p_1078) -> (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0)
c  in CNF:
c     b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_2
c     b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_1
c     b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨  b^{11, 99}_0
c  in DIMACS:
 11678 -11679  11680  1078 -11681 0
 11678 -11679  11680  1078 -11682 0
 11678 -11679  11680  1078  11683 0

c  1-1 --> 0
c    (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0 ∧ -p_1078) -> (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧ -b^{11, 99}_0)
c  in CNF:
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_2
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_1
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_0
c  in DIMACS:
 11678  11679 -11680  1078 -11681 0
 11678  11679 -11680  1078 -11682 0
 11678  11679 -11680  1078 -11683 0

c  0-1 --> -1
c    (-b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧ -p_1078) -> ( b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0)
c  in CNF:
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨  b^{11, 99}_2
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_1
c     b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨  b^{11, 99}_0
c  in DIMACS:
 11678  11679  11680  1078  11681 0
 11678  11679  11680  1078 -11682 0
 11678  11679  11680  1078  11683 0

c  -1-1 --> -2
c    ( b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧  b^{11, 98}_0 ∧ -p_1078) -> ( b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0)
c  in CNF:
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨  b^{11, 99}_2
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨  b^{11, 99}_1
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨  p_1078 ∨ -b^{11, 99}_0
c  in DIMACS:
-11678  11679 -11680  1078  11681 0
-11678  11679 -11680  1078  11682 0
-11678  11679 -11680  1078 -11683 0

c  -2-1 --> break 
c    ( b^{11, 98}_2 ∧  b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨  b^{11, 98}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-11678 -11679  11680  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 98}_2 ∧ -b^{11, 98}_1 ∧ -b^{11, 98}_0 ∧ true) 
c  in CNF:
c    -b^{11, 98}_2 ∨  b^{11, 98}_1 ∨  b^{11, 98}_0 ∨ false 
c  in DIMACS:
-11678  11679  11680  0

c  3 does not represent an automaton state.
c    -(-b^{11, 98}_2 ∧  b^{11, 98}_1 ∧  b^{11, 98}_0 ∧ true) 
c  in CNF:
c     b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ false 
c  in DIMACS:
 11678 -11679 -11680  0
c  -3 does not represent an automaton state.
c    -( b^{11, 98}_2 ∧  b^{11, 98}_1 ∧  b^{11, 98}_0 ∧ true) 
c  in CNF:
c    -b^{11, 98}_2 ∨ -b^{11, 98}_1 ∨ -b^{11, 98}_0 ∨ false 
c  in DIMACS:
-11678 -11679 -11680  0

c i = 99
c  -2+1 --> -1
c    ( b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧  p_1089) -> ( b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0)
c  in CNF:
c    -b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨  b^{11, 100}_2
c    -b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_1
c    -b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨  b^{11, 100}_0
c  in DIMACS:
-11681 -11682  11683 -1089  11684 0
-11681 -11682  11683 -1089 -11685 0
-11681 -11682  11683 -1089  11686 0

c  -1+1 --> 0
c    ( b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0 ∧  p_1089) -> (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧ -b^{11, 100}_0)
c  in CNF:
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_2
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_1
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_0
c  in DIMACS:
-11681  11682 -11683 -1089 -11684 0
-11681  11682 -11683 -1089 -11685 0
-11681  11682 -11683 -1089 -11686 0

c  0+1 --> 1
c    (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧  p_1089) -> (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0)
c  in CNF:
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_2
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_1
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨  b^{11, 100}_0
c  in DIMACS:
 11681  11682  11683 -1089 -11684 0
 11681  11682  11683 -1089 -11685 0
 11681  11682  11683 -1089  11686 0

c  1+1 --> 2
c    (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0 ∧  p_1089) -> (-b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0)
c  in CNF:
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_2
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨  b^{11, 100}_1
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ -p_1089 ∨ -b^{11, 100}_0
c  in DIMACS:
 11681  11682 -11683 -1089 -11684 0
 11681  11682 -11683 -1089  11685 0
 11681  11682 -11683 -1089 -11686 0

c  2+1 --> break 
c    (-b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 11681 -11682  11683 -1089 1162 0


c  2-1 --> 1
c    (-b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧ -p_1089) -> (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0)
c  in CNF:
c     b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_2
c     b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_1
c     b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨  b^{11, 100}_0
c  in DIMACS:
 11681 -11682  11683  1089 -11684 0
 11681 -11682  11683  1089 -11685 0
 11681 -11682  11683  1089  11686 0

c  1-1 --> 0
c    (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0 ∧ -p_1089) -> (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧ -b^{11, 100}_0)
c  in CNF:
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_2
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_1
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_0
c  in DIMACS:
 11681  11682 -11683  1089 -11684 0
 11681  11682 -11683  1089 -11685 0
 11681  11682 -11683  1089 -11686 0

c  0-1 --> -1
c    (-b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧ -p_1089) -> ( b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0)
c  in CNF:
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨  b^{11, 100}_2
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_1
c     b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨  b^{11, 100}_0
c  in DIMACS:
 11681  11682  11683  1089  11684 0
 11681  11682  11683  1089 -11685 0
 11681  11682  11683  1089  11686 0

c  -1-1 --> -2
c    ( b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧  b^{11, 99}_0 ∧ -p_1089) -> ( b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0)
c  in CNF:
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨  b^{11, 100}_2
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨  b^{11, 100}_1
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨  p_1089 ∨ -b^{11, 100}_0
c  in DIMACS:
-11681  11682 -11683  1089  11684 0
-11681  11682 -11683  1089  11685 0
-11681  11682 -11683  1089 -11686 0

c  -2-1 --> break 
c    ( b^{11, 99}_2 ∧  b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨  b^{11, 99}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-11681 -11682  11683  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 99}_2 ∧ -b^{11, 99}_1 ∧ -b^{11, 99}_0 ∧ true) 
c  in CNF:
c    -b^{11, 99}_2 ∨  b^{11, 99}_1 ∨  b^{11, 99}_0 ∨ false 
c  in DIMACS:
-11681  11682  11683  0

c  3 does not represent an automaton state.
c    -(-b^{11, 99}_2 ∧  b^{11, 99}_1 ∧  b^{11, 99}_0 ∧ true) 
c  in CNF:
c     b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ false 
c  in DIMACS:
 11681 -11682 -11683  0
c  -3 does not represent an automaton state.
c    -( b^{11, 99}_2 ∧  b^{11, 99}_1 ∧  b^{11, 99}_0 ∧ true) 
c  in CNF:
c    -b^{11, 99}_2 ∨ -b^{11, 99}_1 ∨ -b^{11, 99}_0 ∨ false 
c  in DIMACS:
-11681 -11682 -11683  0

c i = 100
c  -2+1 --> -1
c    ( b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧  p_1100) -> ( b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0)
c  in CNF:
c    -b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨  b^{11, 101}_2
c    -b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_1
c    -b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨  b^{11, 101}_0
c  in DIMACS:
-11684 -11685  11686 -1100  11687 0
-11684 -11685  11686 -1100 -11688 0
-11684 -11685  11686 -1100  11689 0

c  -1+1 --> 0
c    ( b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0 ∧  p_1100) -> (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧ -b^{11, 101}_0)
c  in CNF:
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_2
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_1
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_0
c  in DIMACS:
-11684  11685 -11686 -1100 -11687 0
-11684  11685 -11686 -1100 -11688 0
-11684  11685 -11686 -1100 -11689 0

c  0+1 --> 1
c    (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧  p_1100) -> (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0)
c  in CNF:
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_2
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_1
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨  b^{11, 101}_0
c  in DIMACS:
 11684  11685  11686 -1100 -11687 0
 11684  11685  11686 -1100 -11688 0
 11684  11685  11686 -1100  11689 0

c  1+1 --> 2
c    (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0 ∧  p_1100) -> (-b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0)
c  in CNF:
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_2
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨  b^{11, 101}_1
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ -p_1100 ∨ -b^{11, 101}_0
c  in DIMACS:
 11684  11685 -11686 -1100 -11687 0
 11684  11685 -11686 -1100  11688 0
 11684  11685 -11686 -1100 -11689 0

c  2+1 --> break 
c    (-b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 11684 -11685  11686 -1100 1162 0


c  2-1 --> 1
c    (-b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧ -p_1100) -> (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0)
c  in CNF:
c     b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_2
c     b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_1
c     b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨  b^{11, 101}_0
c  in DIMACS:
 11684 -11685  11686  1100 -11687 0
 11684 -11685  11686  1100 -11688 0
 11684 -11685  11686  1100  11689 0

c  1-1 --> 0
c    (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0 ∧ -p_1100) -> (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧ -b^{11, 101}_0)
c  in CNF:
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_2
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_1
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_0
c  in DIMACS:
 11684  11685 -11686  1100 -11687 0
 11684  11685 -11686  1100 -11688 0
 11684  11685 -11686  1100 -11689 0

c  0-1 --> -1
c    (-b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧ -p_1100) -> ( b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0)
c  in CNF:
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨  b^{11, 101}_2
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_1
c     b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨  b^{11, 101}_0
c  in DIMACS:
 11684  11685  11686  1100  11687 0
 11684  11685  11686  1100 -11688 0
 11684  11685  11686  1100  11689 0

c  -1-1 --> -2
c    ( b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧  b^{11, 100}_0 ∧ -p_1100) -> ( b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0)
c  in CNF:
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨  b^{11, 101}_2
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨  b^{11, 101}_1
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨  p_1100 ∨ -b^{11, 101}_0
c  in DIMACS:
-11684  11685 -11686  1100  11687 0
-11684  11685 -11686  1100  11688 0
-11684  11685 -11686  1100 -11689 0

c  -2-1 --> break 
c    ( b^{11, 100}_2 ∧  b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨  b^{11, 100}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-11684 -11685  11686  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 100}_2 ∧ -b^{11, 100}_1 ∧ -b^{11, 100}_0 ∧ true) 
c  in CNF:
c    -b^{11, 100}_2 ∨  b^{11, 100}_1 ∨  b^{11, 100}_0 ∨ false 
c  in DIMACS:
-11684  11685  11686  0

c  3 does not represent an automaton state.
c    -(-b^{11, 100}_2 ∧  b^{11, 100}_1 ∧  b^{11, 100}_0 ∧ true) 
c  in CNF:
c     b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ false 
c  in DIMACS:
 11684 -11685 -11686  0
c  -3 does not represent an automaton state.
c    -( b^{11, 100}_2 ∧  b^{11, 100}_1 ∧  b^{11, 100}_0 ∧ true) 
c  in CNF:
c    -b^{11, 100}_2 ∨ -b^{11, 100}_1 ∨ -b^{11, 100}_0 ∨ false 
c  in DIMACS:
-11684 -11685 -11686  0

c i = 101
c  -2+1 --> -1
c    ( b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧  p_1111) -> ( b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0)
c  in CNF:
c    -b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨  b^{11, 102}_2
c    -b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_1
c    -b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨  b^{11, 102}_0
c  in DIMACS:
-11687 -11688  11689 -1111  11690 0
-11687 -11688  11689 -1111 -11691 0
-11687 -11688  11689 -1111  11692 0

c  -1+1 --> 0
c    ( b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0 ∧  p_1111) -> (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧ -b^{11, 102}_0)
c  in CNF:
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_2
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_1
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_0
c  in DIMACS:
-11687  11688 -11689 -1111 -11690 0
-11687  11688 -11689 -1111 -11691 0
-11687  11688 -11689 -1111 -11692 0

c  0+1 --> 1
c    (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧  p_1111) -> (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0)
c  in CNF:
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_2
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_1
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨  b^{11, 102}_0
c  in DIMACS:
 11687  11688  11689 -1111 -11690 0
 11687  11688  11689 -1111 -11691 0
 11687  11688  11689 -1111  11692 0

c  1+1 --> 2
c    (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0 ∧  p_1111) -> (-b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0)
c  in CNF:
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_2
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨  b^{11, 102}_1
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ -p_1111 ∨ -b^{11, 102}_0
c  in DIMACS:
 11687  11688 -11689 -1111 -11690 0
 11687  11688 -11689 -1111  11691 0
 11687  11688 -11689 -1111 -11692 0

c  2+1 --> break 
c    (-b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧  p_1111) -> break
c  in CNF:
c     b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ -p_1111 ∨ break
c  in DIMACS:
 11687 -11688  11689 -1111 1162 0


c  2-1 --> 1
c    (-b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧ -p_1111) -> (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0)
c  in CNF:
c     b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_2
c     b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_1
c     b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨  b^{11, 102}_0
c  in DIMACS:
 11687 -11688  11689  1111 -11690 0
 11687 -11688  11689  1111 -11691 0
 11687 -11688  11689  1111  11692 0

c  1-1 --> 0
c    (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0 ∧ -p_1111) -> (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧ -b^{11, 102}_0)
c  in CNF:
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_2
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_1
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_0
c  in DIMACS:
 11687  11688 -11689  1111 -11690 0
 11687  11688 -11689  1111 -11691 0
 11687  11688 -11689  1111 -11692 0

c  0-1 --> -1
c    (-b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧ -p_1111) -> ( b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0)
c  in CNF:
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨  b^{11, 102}_2
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_1
c     b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨  b^{11, 102}_0
c  in DIMACS:
 11687  11688  11689  1111  11690 0
 11687  11688  11689  1111 -11691 0
 11687  11688  11689  1111  11692 0

c  -1-1 --> -2
c    ( b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧  b^{11, 101}_0 ∧ -p_1111) -> ( b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0)
c  in CNF:
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨  b^{11, 102}_2
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨  b^{11, 102}_1
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨  p_1111 ∨ -b^{11, 102}_0
c  in DIMACS:
-11687  11688 -11689  1111  11690 0
-11687  11688 -11689  1111  11691 0
-11687  11688 -11689  1111 -11692 0

c  -2-1 --> break 
c    ( b^{11, 101}_2 ∧  b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧ -p_1111) -> break
c  in CNF:
c    -b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨  b^{11, 101}_0 ∨  p_1111 ∨ break
c  in DIMACS:
-11687 -11688  11689  1111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 101}_2 ∧ -b^{11, 101}_1 ∧ -b^{11, 101}_0 ∧ true) 
c  in CNF:
c    -b^{11, 101}_2 ∨  b^{11, 101}_1 ∨  b^{11, 101}_0 ∨ false 
c  in DIMACS:
-11687  11688  11689  0

c  3 does not represent an automaton state.
c    -(-b^{11, 101}_2 ∧  b^{11, 101}_1 ∧  b^{11, 101}_0 ∧ true) 
c  in CNF:
c     b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ false 
c  in DIMACS:
 11687 -11688 -11689  0
c  -3 does not represent an automaton state.
c    -( b^{11, 101}_2 ∧  b^{11, 101}_1 ∧  b^{11, 101}_0 ∧ true) 
c  in CNF:
c    -b^{11, 101}_2 ∨ -b^{11, 101}_1 ∨ -b^{11, 101}_0 ∨ false 
c  in DIMACS:
-11687 -11688 -11689  0

c i = 102
c  -2+1 --> -1
c    ( b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧  p_1122) -> ( b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0)
c  in CNF:
c    -b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨  b^{11, 103}_2
c    -b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_1
c    -b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨  b^{11, 103}_0
c  in DIMACS:
-11690 -11691  11692 -1122  11693 0
-11690 -11691  11692 -1122 -11694 0
-11690 -11691  11692 -1122  11695 0

c  -1+1 --> 0
c    ( b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0 ∧  p_1122) -> (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧ -b^{11, 103}_0)
c  in CNF:
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_2
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_1
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_0
c  in DIMACS:
-11690  11691 -11692 -1122 -11693 0
-11690  11691 -11692 -1122 -11694 0
-11690  11691 -11692 -1122 -11695 0

c  0+1 --> 1
c    (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧  p_1122) -> (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0)
c  in CNF:
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_2
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_1
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨  b^{11, 103}_0
c  in DIMACS:
 11690  11691  11692 -1122 -11693 0
 11690  11691  11692 -1122 -11694 0
 11690  11691  11692 -1122  11695 0

c  1+1 --> 2
c    (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0 ∧  p_1122) -> (-b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0)
c  in CNF:
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_2
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨  b^{11, 103}_1
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ -p_1122 ∨ -b^{11, 103}_0
c  in DIMACS:
 11690  11691 -11692 -1122 -11693 0
 11690  11691 -11692 -1122  11694 0
 11690  11691 -11692 -1122 -11695 0

c  2+1 --> break 
c    (-b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 11690 -11691  11692 -1122 1162 0


c  2-1 --> 1
c    (-b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧ -p_1122) -> (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0)
c  in CNF:
c     b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_2
c     b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_1
c     b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨  b^{11, 103}_0
c  in DIMACS:
 11690 -11691  11692  1122 -11693 0
 11690 -11691  11692  1122 -11694 0
 11690 -11691  11692  1122  11695 0

c  1-1 --> 0
c    (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0 ∧ -p_1122) -> (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧ -b^{11, 103}_0)
c  in CNF:
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_2
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_1
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_0
c  in DIMACS:
 11690  11691 -11692  1122 -11693 0
 11690  11691 -11692  1122 -11694 0
 11690  11691 -11692  1122 -11695 0

c  0-1 --> -1
c    (-b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧ -p_1122) -> ( b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0)
c  in CNF:
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨  b^{11, 103}_2
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_1
c     b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨  b^{11, 103}_0
c  in DIMACS:
 11690  11691  11692  1122  11693 0
 11690  11691  11692  1122 -11694 0
 11690  11691  11692  1122  11695 0

c  -1-1 --> -2
c    ( b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧  b^{11, 102}_0 ∧ -p_1122) -> ( b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0)
c  in CNF:
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨  b^{11, 103}_2
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨  b^{11, 103}_1
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨  p_1122 ∨ -b^{11, 103}_0
c  in DIMACS:
-11690  11691 -11692  1122  11693 0
-11690  11691 -11692  1122  11694 0
-11690  11691 -11692  1122 -11695 0

c  -2-1 --> break 
c    ( b^{11, 102}_2 ∧  b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨  b^{11, 102}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-11690 -11691  11692  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 102}_2 ∧ -b^{11, 102}_1 ∧ -b^{11, 102}_0 ∧ true) 
c  in CNF:
c    -b^{11, 102}_2 ∨  b^{11, 102}_1 ∨  b^{11, 102}_0 ∨ false 
c  in DIMACS:
-11690  11691  11692  0

c  3 does not represent an automaton state.
c    -(-b^{11, 102}_2 ∧  b^{11, 102}_1 ∧  b^{11, 102}_0 ∧ true) 
c  in CNF:
c     b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ false 
c  in DIMACS:
 11690 -11691 -11692  0
c  -3 does not represent an automaton state.
c    -( b^{11, 102}_2 ∧  b^{11, 102}_1 ∧  b^{11, 102}_0 ∧ true) 
c  in CNF:
c    -b^{11, 102}_2 ∨ -b^{11, 102}_1 ∨ -b^{11, 102}_0 ∨ false 
c  in DIMACS:
-11690 -11691 -11692  0

c i = 103
c  -2+1 --> -1
c    ( b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧  p_1133) -> ( b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0)
c  in CNF:
c    -b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨  b^{11, 104}_2
c    -b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_1
c    -b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨  b^{11, 104}_0
c  in DIMACS:
-11693 -11694  11695 -1133  11696 0
-11693 -11694  11695 -1133 -11697 0
-11693 -11694  11695 -1133  11698 0

c  -1+1 --> 0
c    ( b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0 ∧  p_1133) -> (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧ -b^{11, 104}_0)
c  in CNF:
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_2
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_1
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_0
c  in DIMACS:
-11693  11694 -11695 -1133 -11696 0
-11693  11694 -11695 -1133 -11697 0
-11693  11694 -11695 -1133 -11698 0

c  0+1 --> 1
c    (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧  p_1133) -> (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0)
c  in CNF:
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_2
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_1
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨  b^{11, 104}_0
c  in DIMACS:
 11693  11694  11695 -1133 -11696 0
 11693  11694  11695 -1133 -11697 0
 11693  11694  11695 -1133  11698 0

c  1+1 --> 2
c    (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0 ∧  p_1133) -> (-b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0)
c  in CNF:
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_2
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨  b^{11, 104}_1
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ -p_1133 ∨ -b^{11, 104}_0
c  in DIMACS:
 11693  11694 -11695 -1133 -11696 0
 11693  11694 -11695 -1133  11697 0
 11693  11694 -11695 -1133 -11698 0

c  2+1 --> break 
c    (-b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧  p_1133) -> break
c  in CNF:
c     b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ -p_1133 ∨ break
c  in DIMACS:
 11693 -11694  11695 -1133 1162 0


c  2-1 --> 1
c    (-b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧ -p_1133) -> (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0)
c  in CNF:
c     b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_2
c     b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_1
c     b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨  b^{11, 104}_0
c  in DIMACS:
 11693 -11694  11695  1133 -11696 0
 11693 -11694  11695  1133 -11697 0
 11693 -11694  11695  1133  11698 0

c  1-1 --> 0
c    (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0 ∧ -p_1133) -> (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧ -b^{11, 104}_0)
c  in CNF:
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_2
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_1
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_0
c  in DIMACS:
 11693  11694 -11695  1133 -11696 0
 11693  11694 -11695  1133 -11697 0
 11693  11694 -11695  1133 -11698 0

c  0-1 --> -1
c    (-b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧ -p_1133) -> ( b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0)
c  in CNF:
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨  b^{11, 104}_2
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_1
c     b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨  b^{11, 104}_0
c  in DIMACS:
 11693  11694  11695  1133  11696 0
 11693  11694  11695  1133 -11697 0
 11693  11694  11695  1133  11698 0

c  -1-1 --> -2
c    ( b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧  b^{11, 103}_0 ∧ -p_1133) -> ( b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0)
c  in CNF:
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨  b^{11, 104}_2
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨  b^{11, 104}_1
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨  p_1133 ∨ -b^{11, 104}_0
c  in DIMACS:
-11693  11694 -11695  1133  11696 0
-11693  11694 -11695  1133  11697 0
-11693  11694 -11695  1133 -11698 0

c  -2-1 --> break 
c    ( b^{11, 103}_2 ∧  b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧ -p_1133) -> break
c  in CNF:
c    -b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨  b^{11, 103}_0 ∨  p_1133 ∨ break
c  in DIMACS:
-11693 -11694  11695  1133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 103}_2 ∧ -b^{11, 103}_1 ∧ -b^{11, 103}_0 ∧ true) 
c  in CNF:
c    -b^{11, 103}_2 ∨  b^{11, 103}_1 ∨  b^{11, 103}_0 ∨ false 
c  in DIMACS:
-11693  11694  11695  0

c  3 does not represent an automaton state.
c    -(-b^{11, 103}_2 ∧  b^{11, 103}_1 ∧  b^{11, 103}_0 ∧ true) 
c  in CNF:
c     b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ false 
c  in DIMACS:
 11693 -11694 -11695  0
c  -3 does not represent an automaton state.
c    -( b^{11, 103}_2 ∧  b^{11, 103}_1 ∧  b^{11, 103}_0 ∧ true) 
c  in CNF:
c    -b^{11, 103}_2 ∨ -b^{11, 103}_1 ∨ -b^{11, 103}_0 ∨ false 
c  in DIMACS:
-11693 -11694 -11695  0

c i = 104
c  -2+1 --> -1
c    ( b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧  p_1144) -> ( b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0)
c  in CNF:
c    -b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨  b^{11, 105}_2
c    -b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_1
c    -b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨  b^{11, 105}_0
c  in DIMACS:
-11696 -11697  11698 -1144  11699 0
-11696 -11697  11698 -1144 -11700 0
-11696 -11697  11698 -1144  11701 0

c  -1+1 --> 0
c    ( b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0 ∧  p_1144) -> (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧ -b^{11, 105}_0)
c  in CNF:
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_2
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_1
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_0
c  in DIMACS:
-11696  11697 -11698 -1144 -11699 0
-11696  11697 -11698 -1144 -11700 0
-11696  11697 -11698 -1144 -11701 0

c  0+1 --> 1
c    (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧  p_1144) -> (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0)
c  in CNF:
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_2
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_1
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨  b^{11, 105}_0
c  in DIMACS:
 11696  11697  11698 -1144 -11699 0
 11696  11697  11698 -1144 -11700 0
 11696  11697  11698 -1144  11701 0

c  1+1 --> 2
c    (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0 ∧  p_1144) -> (-b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0)
c  in CNF:
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_2
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨  b^{11, 105}_1
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ -p_1144 ∨ -b^{11, 105}_0
c  in DIMACS:
 11696  11697 -11698 -1144 -11699 0
 11696  11697 -11698 -1144  11700 0
 11696  11697 -11698 -1144 -11701 0

c  2+1 --> break 
c    (-b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 11696 -11697  11698 -1144 1162 0


c  2-1 --> 1
c    (-b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧ -p_1144) -> (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0)
c  in CNF:
c     b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_2
c     b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_1
c     b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨  b^{11, 105}_0
c  in DIMACS:
 11696 -11697  11698  1144 -11699 0
 11696 -11697  11698  1144 -11700 0
 11696 -11697  11698  1144  11701 0

c  1-1 --> 0
c    (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0 ∧ -p_1144) -> (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧ -b^{11, 105}_0)
c  in CNF:
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_2
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_1
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_0
c  in DIMACS:
 11696  11697 -11698  1144 -11699 0
 11696  11697 -11698  1144 -11700 0
 11696  11697 -11698  1144 -11701 0

c  0-1 --> -1
c    (-b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧ -p_1144) -> ( b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0)
c  in CNF:
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨  b^{11, 105}_2
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_1
c     b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨  b^{11, 105}_0
c  in DIMACS:
 11696  11697  11698  1144  11699 0
 11696  11697  11698  1144 -11700 0
 11696  11697  11698  1144  11701 0

c  -1-1 --> -2
c    ( b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧  b^{11, 104}_0 ∧ -p_1144) -> ( b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0)
c  in CNF:
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨  b^{11, 105}_2
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨  b^{11, 105}_1
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨  p_1144 ∨ -b^{11, 105}_0
c  in DIMACS:
-11696  11697 -11698  1144  11699 0
-11696  11697 -11698  1144  11700 0
-11696  11697 -11698  1144 -11701 0

c  -2-1 --> break 
c    ( b^{11, 104}_2 ∧  b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨  b^{11, 104}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-11696 -11697  11698  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 104}_2 ∧ -b^{11, 104}_1 ∧ -b^{11, 104}_0 ∧ true) 
c  in CNF:
c    -b^{11, 104}_2 ∨  b^{11, 104}_1 ∨  b^{11, 104}_0 ∨ false 
c  in DIMACS:
-11696  11697  11698  0

c  3 does not represent an automaton state.
c    -(-b^{11, 104}_2 ∧  b^{11, 104}_1 ∧  b^{11, 104}_0 ∧ true) 
c  in CNF:
c     b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ false 
c  in DIMACS:
 11696 -11697 -11698  0
c  -3 does not represent an automaton state.
c    -( b^{11, 104}_2 ∧  b^{11, 104}_1 ∧  b^{11, 104}_0 ∧ true) 
c  in CNF:
c    -b^{11, 104}_2 ∨ -b^{11, 104}_1 ∨ -b^{11, 104}_0 ∨ false 
c  in DIMACS:
-11696 -11697 -11698  0

c i = 105
c  -2+1 --> -1
c    ( b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧  p_1155) -> ( b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧  b^{11, 106}_0)
c  in CNF:
c    -b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨  b^{11, 106}_2
c    -b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_1
c    -b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨  b^{11, 106}_0
c  in DIMACS:
-11699 -11700  11701 -1155  11702 0
-11699 -11700  11701 -1155 -11703 0
-11699 -11700  11701 -1155  11704 0

c  -1+1 --> 0
c    ( b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0 ∧  p_1155) -> (-b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧ -b^{11, 106}_0)
c  in CNF:
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_2
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_1
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_0
c  in DIMACS:
-11699  11700 -11701 -1155 -11702 0
-11699  11700 -11701 -1155 -11703 0
-11699  11700 -11701 -1155 -11704 0

c  0+1 --> 1
c    (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧  p_1155) -> (-b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧  b^{11, 106}_0)
c  in CNF:
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_2
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_1
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨  b^{11, 106}_0
c  in DIMACS:
 11699  11700  11701 -1155 -11702 0
 11699  11700  11701 -1155 -11703 0
 11699  11700  11701 -1155  11704 0

c  1+1 --> 2
c    (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0 ∧  p_1155) -> (-b^{11, 106}_2 ∧  b^{11, 106}_1 ∧ -b^{11, 106}_0)
c  in CNF:
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_2
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨  b^{11, 106}_1
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ -p_1155 ∨ -b^{11, 106}_0
c  in DIMACS:
 11699  11700 -11701 -1155 -11702 0
 11699  11700 -11701 -1155  11703 0
 11699  11700 -11701 -1155 -11704 0

c  2+1 --> break 
c    (-b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 11699 -11700  11701 -1155 1162 0


c  2-1 --> 1
c    (-b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧ -p_1155) -> (-b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧  b^{11, 106}_0)
c  in CNF:
c     b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_2
c     b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_1
c     b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨  b^{11, 106}_0
c  in DIMACS:
 11699 -11700  11701  1155 -11702 0
 11699 -11700  11701  1155 -11703 0
 11699 -11700  11701  1155  11704 0

c  1-1 --> 0
c    (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0 ∧ -p_1155) -> (-b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧ -b^{11, 106}_0)
c  in CNF:
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_2
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_1
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_0
c  in DIMACS:
 11699  11700 -11701  1155 -11702 0
 11699  11700 -11701  1155 -11703 0
 11699  11700 -11701  1155 -11704 0

c  0-1 --> -1
c    (-b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧ -p_1155) -> ( b^{11, 106}_2 ∧ -b^{11, 106}_1 ∧  b^{11, 106}_0)
c  in CNF:
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨  b^{11, 106}_2
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_1
c     b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨  b^{11, 106}_0
c  in DIMACS:
 11699  11700  11701  1155  11702 0
 11699  11700  11701  1155 -11703 0
 11699  11700  11701  1155  11704 0

c  -1-1 --> -2
c    ( b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧  b^{11, 105}_0 ∧ -p_1155) -> ( b^{11, 106}_2 ∧  b^{11, 106}_1 ∧ -b^{11, 106}_0)
c  in CNF:
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨  b^{11, 106}_2
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨  b^{11, 106}_1
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨  p_1155 ∨ -b^{11, 106}_0
c  in DIMACS:
-11699  11700 -11701  1155  11702 0
-11699  11700 -11701  1155  11703 0
-11699  11700 -11701  1155 -11704 0

c  -2-1 --> break 
c    ( b^{11, 105}_2 ∧  b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨  b^{11, 105}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-11699 -11700  11701  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{11, 105}_2 ∧ -b^{11, 105}_1 ∧ -b^{11, 105}_0 ∧ true) 
c  in CNF:
c    -b^{11, 105}_2 ∨  b^{11, 105}_1 ∨  b^{11, 105}_0 ∨ false 
c  in DIMACS:
-11699  11700  11701  0

c  3 does not represent an automaton state.
c    -(-b^{11, 105}_2 ∧  b^{11, 105}_1 ∧  b^{11, 105}_0 ∧ true) 
c  in CNF:
c     b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ false 
c  in DIMACS:
 11699 -11700 -11701  0
c  -3 does not represent an automaton state.
c    -( b^{11, 105}_2 ∧  b^{11, 105}_1 ∧  b^{11, 105}_0 ∧ true) 
c  in CNF:
c    -b^{11, 105}_2 ∨ -b^{11, 105}_1 ∨ -b^{11, 105}_0 ∨ false 
c  in DIMACS:
-11699 -11700 -11701  0

c INIT for k = 12
c    -b^{12, 1}_2
c    -b^{12, 1}_1
c    -b^{12, 1}_0
c  in DIMACS:
-11705 0
-11706 0
-11707 0

c Transitions for k = 12
c i = 1
c  -2+1 --> -1
c    ( b^{12, 1}_2 ∧  b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧  p_12) -> ( b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0)
c  in CNF:
c    -b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨  b^{12, 2}_2
c    -b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_1
c    -b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨  b^{12, 2}_0
c  in DIMACS:
-11705 -11706  11707 -12  11708 0
-11705 -11706  11707 -12 -11709 0
-11705 -11706  11707 -12  11710 0

c  -1+1 --> 0
c    ( b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧  b^{12, 1}_0 ∧  p_12) -> (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧ -b^{12, 2}_0)
c  in CNF:
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_2
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_1
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_0
c  in DIMACS:
-11705  11706 -11707 -12 -11708 0
-11705  11706 -11707 -12 -11709 0
-11705  11706 -11707 -12 -11710 0

c  0+1 --> 1
c    (-b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧  p_12) -> (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0)
c  in CNF:
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_2
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_1
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨  b^{12, 2}_0
c  in DIMACS:
 11705  11706  11707 -12 -11708 0
 11705  11706  11707 -12 -11709 0
 11705  11706  11707 -12  11710 0

c  1+1 --> 2
c    (-b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧  b^{12, 1}_0 ∧  p_12) -> (-b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0)
c  in CNF:
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_2
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨  b^{12, 2}_1
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ -p_12 ∨ -b^{12, 2}_0
c  in DIMACS:
 11705  11706 -11707 -12 -11708 0
 11705  11706 -11707 -12  11709 0
 11705  11706 -11707 -12 -11710 0

c  2+1 --> break 
c    (-b^{12, 1}_2 ∧  b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧  p_12) -> break
c  in CNF:
c     b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ -p_12 ∨ break
c  in DIMACS:
 11705 -11706  11707 -12 1162 0


c  2-1 --> 1
c    (-b^{12, 1}_2 ∧  b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧ -p_12) -> (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0)
c  in CNF:
c     b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_2
c     b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_1
c     b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨  b^{12, 2}_0
c  in DIMACS:
 11705 -11706  11707  12 -11708 0
 11705 -11706  11707  12 -11709 0
 11705 -11706  11707  12  11710 0

c  1-1 --> 0
c    (-b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧  b^{12, 1}_0 ∧ -p_12) -> (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧ -b^{12, 2}_0)
c  in CNF:
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_2
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_1
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_0
c  in DIMACS:
 11705  11706 -11707  12 -11708 0
 11705  11706 -11707  12 -11709 0
 11705  11706 -11707  12 -11710 0

c  0-1 --> -1
c    (-b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧ -p_12) -> ( b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0)
c  in CNF:
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨  b^{12, 2}_2
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_1
c     b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨  b^{12, 2}_0
c  in DIMACS:
 11705  11706  11707  12  11708 0
 11705  11706  11707  12 -11709 0
 11705  11706  11707  12  11710 0

c  -1-1 --> -2
c    ( b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧  b^{12, 1}_0 ∧ -p_12) -> ( b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0)
c  in CNF:
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨  b^{12, 2}_2
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨  b^{12, 2}_1
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨  p_12 ∨ -b^{12, 2}_0
c  in DIMACS:
-11705  11706 -11707  12  11708 0
-11705  11706 -11707  12  11709 0
-11705  11706 -11707  12 -11710 0

c  -2-1 --> break 
c    ( b^{12, 1}_2 ∧  b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧ -p_12) -> break
c  in CNF:
c    -b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨  b^{12, 1}_0 ∨  p_12 ∨ break
c  in DIMACS:
-11705 -11706  11707  12 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 1}_2 ∧ -b^{12, 1}_1 ∧ -b^{12, 1}_0 ∧ true) 
c  in CNF:
c    -b^{12, 1}_2 ∨  b^{12, 1}_1 ∨  b^{12, 1}_0 ∨ false 
c  in DIMACS:
-11705  11706  11707  0

c  3 does not represent an automaton state.
c    -(-b^{12, 1}_2 ∧  b^{12, 1}_1 ∧  b^{12, 1}_0 ∧ true) 
c  in CNF:
c     b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ false 
c  in DIMACS:
 11705 -11706 -11707  0
c  -3 does not represent an automaton state.
c    -( b^{12, 1}_2 ∧  b^{12, 1}_1 ∧  b^{12, 1}_0 ∧ true) 
c  in CNF:
c    -b^{12, 1}_2 ∨ -b^{12, 1}_1 ∨ -b^{12, 1}_0 ∨ false 
c  in DIMACS:
-11705 -11706 -11707  0

c i = 2
c  -2+1 --> -1
c    ( b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧  p_24) -> ( b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0)
c  in CNF:
c    -b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨  b^{12, 3}_2
c    -b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_1
c    -b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨  b^{12, 3}_0
c  in DIMACS:
-11708 -11709  11710 -24  11711 0
-11708 -11709  11710 -24 -11712 0
-11708 -11709  11710 -24  11713 0

c  -1+1 --> 0
c    ( b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0 ∧  p_24) -> (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧ -b^{12, 3}_0)
c  in CNF:
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_2
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_1
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_0
c  in DIMACS:
-11708  11709 -11710 -24 -11711 0
-11708  11709 -11710 -24 -11712 0
-11708  11709 -11710 -24 -11713 0

c  0+1 --> 1
c    (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧  p_24) -> (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0)
c  in CNF:
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_2
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_1
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨  b^{12, 3}_0
c  in DIMACS:
 11708  11709  11710 -24 -11711 0
 11708  11709  11710 -24 -11712 0
 11708  11709  11710 -24  11713 0

c  1+1 --> 2
c    (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0 ∧  p_24) -> (-b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0)
c  in CNF:
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_2
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨  b^{12, 3}_1
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ -p_24 ∨ -b^{12, 3}_0
c  in DIMACS:
 11708  11709 -11710 -24 -11711 0
 11708  11709 -11710 -24  11712 0
 11708  11709 -11710 -24 -11713 0

c  2+1 --> break 
c    (-b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧  p_24) -> break
c  in CNF:
c     b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 11708 -11709  11710 -24 1162 0


c  2-1 --> 1
c    (-b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧ -p_24) -> (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0)
c  in CNF:
c     b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_2
c     b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_1
c     b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨  b^{12, 3}_0
c  in DIMACS:
 11708 -11709  11710  24 -11711 0
 11708 -11709  11710  24 -11712 0
 11708 -11709  11710  24  11713 0

c  1-1 --> 0
c    (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0 ∧ -p_24) -> (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧ -b^{12, 3}_0)
c  in CNF:
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_2
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_1
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_0
c  in DIMACS:
 11708  11709 -11710  24 -11711 0
 11708  11709 -11710  24 -11712 0
 11708  11709 -11710  24 -11713 0

c  0-1 --> -1
c    (-b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧ -p_24) -> ( b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0)
c  in CNF:
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨  b^{12, 3}_2
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_1
c     b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨  b^{12, 3}_0
c  in DIMACS:
 11708  11709  11710  24  11711 0
 11708  11709  11710  24 -11712 0
 11708  11709  11710  24  11713 0

c  -1-1 --> -2
c    ( b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧  b^{12, 2}_0 ∧ -p_24) -> ( b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0)
c  in CNF:
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨  b^{12, 3}_2
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨  b^{12, 3}_1
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨  p_24 ∨ -b^{12, 3}_0
c  in DIMACS:
-11708  11709 -11710  24  11711 0
-11708  11709 -11710  24  11712 0
-11708  11709 -11710  24 -11713 0

c  -2-1 --> break 
c    ( b^{12, 2}_2 ∧  b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨  b^{12, 2}_0 ∨  p_24 ∨ break
c  in DIMACS:
-11708 -11709  11710  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 2}_2 ∧ -b^{12, 2}_1 ∧ -b^{12, 2}_0 ∧ true) 
c  in CNF:
c    -b^{12, 2}_2 ∨  b^{12, 2}_1 ∨  b^{12, 2}_0 ∨ false 
c  in DIMACS:
-11708  11709  11710  0

c  3 does not represent an automaton state.
c    -(-b^{12, 2}_2 ∧  b^{12, 2}_1 ∧  b^{12, 2}_0 ∧ true) 
c  in CNF:
c     b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ false 
c  in DIMACS:
 11708 -11709 -11710  0
c  -3 does not represent an automaton state.
c    -( b^{12, 2}_2 ∧  b^{12, 2}_1 ∧  b^{12, 2}_0 ∧ true) 
c  in CNF:
c    -b^{12, 2}_2 ∨ -b^{12, 2}_1 ∨ -b^{12, 2}_0 ∨ false 
c  in DIMACS:
-11708 -11709 -11710  0

c i = 3
c  -2+1 --> -1
c    ( b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧  p_36) -> ( b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0)
c  in CNF:
c    -b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨  b^{12, 4}_2
c    -b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_1
c    -b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨  b^{12, 4}_0
c  in DIMACS:
-11711 -11712  11713 -36  11714 0
-11711 -11712  11713 -36 -11715 0
-11711 -11712  11713 -36  11716 0

c  -1+1 --> 0
c    ( b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0 ∧  p_36) -> (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧ -b^{12, 4}_0)
c  in CNF:
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_2
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_1
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_0
c  in DIMACS:
-11711  11712 -11713 -36 -11714 0
-11711  11712 -11713 -36 -11715 0
-11711  11712 -11713 -36 -11716 0

c  0+1 --> 1
c    (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧  p_36) -> (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0)
c  in CNF:
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_2
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_1
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨  b^{12, 4}_0
c  in DIMACS:
 11711  11712  11713 -36 -11714 0
 11711  11712  11713 -36 -11715 0
 11711  11712  11713 -36  11716 0

c  1+1 --> 2
c    (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0 ∧  p_36) -> (-b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0)
c  in CNF:
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_2
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨  b^{12, 4}_1
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ -p_36 ∨ -b^{12, 4}_0
c  in DIMACS:
 11711  11712 -11713 -36 -11714 0
 11711  11712 -11713 -36  11715 0
 11711  11712 -11713 -36 -11716 0

c  2+1 --> break 
c    (-b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧  p_36) -> break
c  in CNF:
c     b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 11711 -11712  11713 -36 1162 0


c  2-1 --> 1
c    (-b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧ -p_36) -> (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0)
c  in CNF:
c     b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_2
c     b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_1
c     b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨  b^{12, 4}_0
c  in DIMACS:
 11711 -11712  11713  36 -11714 0
 11711 -11712  11713  36 -11715 0
 11711 -11712  11713  36  11716 0

c  1-1 --> 0
c    (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0 ∧ -p_36) -> (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧ -b^{12, 4}_0)
c  in CNF:
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_2
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_1
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_0
c  in DIMACS:
 11711  11712 -11713  36 -11714 0
 11711  11712 -11713  36 -11715 0
 11711  11712 -11713  36 -11716 0

c  0-1 --> -1
c    (-b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧ -p_36) -> ( b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0)
c  in CNF:
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨  b^{12, 4}_2
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_1
c     b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨  b^{12, 4}_0
c  in DIMACS:
 11711  11712  11713  36  11714 0
 11711  11712  11713  36 -11715 0
 11711  11712  11713  36  11716 0

c  -1-1 --> -2
c    ( b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧  b^{12, 3}_0 ∧ -p_36) -> ( b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0)
c  in CNF:
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨  b^{12, 4}_2
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨  b^{12, 4}_1
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨  p_36 ∨ -b^{12, 4}_0
c  in DIMACS:
-11711  11712 -11713  36  11714 0
-11711  11712 -11713  36  11715 0
-11711  11712 -11713  36 -11716 0

c  -2-1 --> break 
c    ( b^{12, 3}_2 ∧  b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨  b^{12, 3}_0 ∨  p_36 ∨ break
c  in DIMACS:
-11711 -11712  11713  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 3}_2 ∧ -b^{12, 3}_1 ∧ -b^{12, 3}_0 ∧ true) 
c  in CNF:
c    -b^{12, 3}_2 ∨  b^{12, 3}_1 ∨  b^{12, 3}_0 ∨ false 
c  in DIMACS:
-11711  11712  11713  0

c  3 does not represent an automaton state.
c    -(-b^{12, 3}_2 ∧  b^{12, 3}_1 ∧  b^{12, 3}_0 ∧ true) 
c  in CNF:
c     b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ false 
c  in DIMACS:
 11711 -11712 -11713  0
c  -3 does not represent an automaton state.
c    -( b^{12, 3}_2 ∧  b^{12, 3}_1 ∧  b^{12, 3}_0 ∧ true) 
c  in CNF:
c    -b^{12, 3}_2 ∨ -b^{12, 3}_1 ∨ -b^{12, 3}_0 ∨ false 
c  in DIMACS:
-11711 -11712 -11713  0

c i = 4
c  -2+1 --> -1
c    ( b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧  p_48) -> ( b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0)
c  in CNF:
c    -b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨  b^{12, 5}_2
c    -b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_1
c    -b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨  b^{12, 5}_0
c  in DIMACS:
-11714 -11715  11716 -48  11717 0
-11714 -11715  11716 -48 -11718 0
-11714 -11715  11716 -48  11719 0

c  -1+1 --> 0
c    ( b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0 ∧  p_48) -> (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧ -b^{12, 5}_0)
c  in CNF:
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_2
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_1
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_0
c  in DIMACS:
-11714  11715 -11716 -48 -11717 0
-11714  11715 -11716 -48 -11718 0
-11714  11715 -11716 -48 -11719 0

c  0+1 --> 1
c    (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧  p_48) -> (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0)
c  in CNF:
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_2
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_1
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨  b^{12, 5}_0
c  in DIMACS:
 11714  11715  11716 -48 -11717 0
 11714  11715  11716 -48 -11718 0
 11714  11715  11716 -48  11719 0

c  1+1 --> 2
c    (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0 ∧  p_48) -> (-b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0)
c  in CNF:
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_2
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨  b^{12, 5}_1
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ -p_48 ∨ -b^{12, 5}_0
c  in DIMACS:
 11714  11715 -11716 -48 -11717 0
 11714  11715 -11716 -48  11718 0
 11714  11715 -11716 -48 -11719 0

c  2+1 --> break 
c    (-b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧  p_48) -> break
c  in CNF:
c     b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 11714 -11715  11716 -48 1162 0


c  2-1 --> 1
c    (-b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧ -p_48) -> (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0)
c  in CNF:
c     b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_2
c     b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_1
c     b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨  b^{12, 5}_0
c  in DIMACS:
 11714 -11715  11716  48 -11717 0
 11714 -11715  11716  48 -11718 0
 11714 -11715  11716  48  11719 0

c  1-1 --> 0
c    (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0 ∧ -p_48) -> (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧ -b^{12, 5}_0)
c  in CNF:
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_2
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_1
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_0
c  in DIMACS:
 11714  11715 -11716  48 -11717 0
 11714  11715 -11716  48 -11718 0
 11714  11715 -11716  48 -11719 0

c  0-1 --> -1
c    (-b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧ -p_48) -> ( b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0)
c  in CNF:
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨  b^{12, 5}_2
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_1
c     b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨  b^{12, 5}_0
c  in DIMACS:
 11714  11715  11716  48  11717 0
 11714  11715  11716  48 -11718 0
 11714  11715  11716  48  11719 0

c  -1-1 --> -2
c    ( b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧  b^{12, 4}_0 ∧ -p_48) -> ( b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0)
c  in CNF:
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨  b^{12, 5}_2
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨  b^{12, 5}_1
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨  p_48 ∨ -b^{12, 5}_0
c  in DIMACS:
-11714  11715 -11716  48  11717 0
-11714  11715 -11716  48  11718 0
-11714  11715 -11716  48 -11719 0

c  -2-1 --> break 
c    ( b^{12, 4}_2 ∧  b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨  b^{12, 4}_0 ∨  p_48 ∨ break
c  in DIMACS:
-11714 -11715  11716  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 4}_2 ∧ -b^{12, 4}_1 ∧ -b^{12, 4}_0 ∧ true) 
c  in CNF:
c    -b^{12, 4}_2 ∨  b^{12, 4}_1 ∨  b^{12, 4}_0 ∨ false 
c  in DIMACS:
-11714  11715  11716  0

c  3 does not represent an automaton state.
c    -(-b^{12, 4}_2 ∧  b^{12, 4}_1 ∧  b^{12, 4}_0 ∧ true) 
c  in CNF:
c     b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ false 
c  in DIMACS:
 11714 -11715 -11716  0
c  -3 does not represent an automaton state.
c    -( b^{12, 4}_2 ∧  b^{12, 4}_1 ∧  b^{12, 4}_0 ∧ true) 
c  in CNF:
c    -b^{12, 4}_2 ∨ -b^{12, 4}_1 ∨ -b^{12, 4}_0 ∨ false 
c  in DIMACS:
-11714 -11715 -11716  0

c i = 5
c  -2+1 --> -1
c    ( b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧  p_60) -> ( b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0)
c  in CNF:
c    -b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨  b^{12, 6}_2
c    -b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_1
c    -b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨  b^{12, 6}_0
c  in DIMACS:
-11717 -11718  11719 -60  11720 0
-11717 -11718  11719 -60 -11721 0
-11717 -11718  11719 -60  11722 0

c  -1+1 --> 0
c    ( b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0 ∧  p_60) -> (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧ -b^{12, 6}_0)
c  in CNF:
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_2
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_1
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_0
c  in DIMACS:
-11717  11718 -11719 -60 -11720 0
-11717  11718 -11719 -60 -11721 0
-11717  11718 -11719 -60 -11722 0

c  0+1 --> 1
c    (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧  p_60) -> (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0)
c  in CNF:
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_2
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_1
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨  b^{12, 6}_0
c  in DIMACS:
 11717  11718  11719 -60 -11720 0
 11717  11718  11719 -60 -11721 0
 11717  11718  11719 -60  11722 0

c  1+1 --> 2
c    (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0 ∧  p_60) -> (-b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0)
c  in CNF:
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_2
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨  b^{12, 6}_1
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ -p_60 ∨ -b^{12, 6}_0
c  in DIMACS:
 11717  11718 -11719 -60 -11720 0
 11717  11718 -11719 -60  11721 0
 11717  11718 -11719 -60 -11722 0

c  2+1 --> break 
c    (-b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧  p_60) -> break
c  in CNF:
c     b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 11717 -11718  11719 -60 1162 0


c  2-1 --> 1
c    (-b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧ -p_60) -> (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0)
c  in CNF:
c     b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_2
c     b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_1
c     b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨  b^{12, 6}_0
c  in DIMACS:
 11717 -11718  11719  60 -11720 0
 11717 -11718  11719  60 -11721 0
 11717 -11718  11719  60  11722 0

c  1-1 --> 0
c    (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0 ∧ -p_60) -> (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧ -b^{12, 6}_0)
c  in CNF:
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_2
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_1
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_0
c  in DIMACS:
 11717  11718 -11719  60 -11720 0
 11717  11718 -11719  60 -11721 0
 11717  11718 -11719  60 -11722 0

c  0-1 --> -1
c    (-b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧ -p_60) -> ( b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0)
c  in CNF:
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨  b^{12, 6}_2
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_1
c     b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨  b^{12, 6}_0
c  in DIMACS:
 11717  11718  11719  60  11720 0
 11717  11718  11719  60 -11721 0
 11717  11718  11719  60  11722 0

c  -1-1 --> -2
c    ( b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧  b^{12, 5}_0 ∧ -p_60) -> ( b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0)
c  in CNF:
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨  b^{12, 6}_2
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨  b^{12, 6}_1
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨  p_60 ∨ -b^{12, 6}_0
c  in DIMACS:
-11717  11718 -11719  60  11720 0
-11717  11718 -11719  60  11721 0
-11717  11718 -11719  60 -11722 0

c  -2-1 --> break 
c    ( b^{12, 5}_2 ∧  b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨  b^{12, 5}_0 ∨  p_60 ∨ break
c  in DIMACS:
-11717 -11718  11719  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 5}_2 ∧ -b^{12, 5}_1 ∧ -b^{12, 5}_0 ∧ true) 
c  in CNF:
c    -b^{12, 5}_2 ∨  b^{12, 5}_1 ∨  b^{12, 5}_0 ∨ false 
c  in DIMACS:
-11717  11718  11719  0

c  3 does not represent an automaton state.
c    -(-b^{12, 5}_2 ∧  b^{12, 5}_1 ∧  b^{12, 5}_0 ∧ true) 
c  in CNF:
c     b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ false 
c  in DIMACS:
 11717 -11718 -11719  0
c  -3 does not represent an automaton state.
c    -( b^{12, 5}_2 ∧  b^{12, 5}_1 ∧  b^{12, 5}_0 ∧ true) 
c  in CNF:
c    -b^{12, 5}_2 ∨ -b^{12, 5}_1 ∨ -b^{12, 5}_0 ∨ false 
c  in DIMACS:
-11717 -11718 -11719  0

c i = 6
c  -2+1 --> -1
c    ( b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧  p_72) -> ( b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0)
c  in CNF:
c    -b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨  b^{12, 7}_2
c    -b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_1
c    -b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨  b^{12, 7}_0
c  in DIMACS:
-11720 -11721  11722 -72  11723 0
-11720 -11721  11722 -72 -11724 0
-11720 -11721  11722 -72  11725 0

c  -1+1 --> 0
c    ( b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0 ∧  p_72) -> (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧ -b^{12, 7}_0)
c  in CNF:
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_2
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_1
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_0
c  in DIMACS:
-11720  11721 -11722 -72 -11723 0
-11720  11721 -11722 -72 -11724 0
-11720  11721 -11722 -72 -11725 0

c  0+1 --> 1
c    (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧  p_72) -> (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0)
c  in CNF:
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_2
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_1
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨  b^{12, 7}_0
c  in DIMACS:
 11720  11721  11722 -72 -11723 0
 11720  11721  11722 -72 -11724 0
 11720  11721  11722 -72  11725 0

c  1+1 --> 2
c    (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0 ∧  p_72) -> (-b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0)
c  in CNF:
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_2
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨  b^{12, 7}_1
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ -p_72 ∨ -b^{12, 7}_0
c  in DIMACS:
 11720  11721 -11722 -72 -11723 0
 11720  11721 -11722 -72  11724 0
 11720  11721 -11722 -72 -11725 0

c  2+1 --> break 
c    (-b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧  p_72) -> break
c  in CNF:
c     b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 11720 -11721  11722 -72 1162 0


c  2-1 --> 1
c    (-b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧ -p_72) -> (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0)
c  in CNF:
c     b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_2
c     b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_1
c     b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨  b^{12, 7}_0
c  in DIMACS:
 11720 -11721  11722  72 -11723 0
 11720 -11721  11722  72 -11724 0
 11720 -11721  11722  72  11725 0

c  1-1 --> 0
c    (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0 ∧ -p_72) -> (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧ -b^{12, 7}_0)
c  in CNF:
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_2
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_1
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_0
c  in DIMACS:
 11720  11721 -11722  72 -11723 0
 11720  11721 -11722  72 -11724 0
 11720  11721 -11722  72 -11725 0

c  0-1 --> -1
c    (-b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧ -p_72) -> ( b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0)
c  in CNF:
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨  b^{12, 7}_2
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_1
c     b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨  b^{12, 7}_0
c  in DIMACS:
 11720  11721  11722  72  11723 0
 11720  11721  11722  72 -11724 0
 11720  11721  11722  72  11725 0

c  -1-1 --> -2
c    ( b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧  b^{12, 6}_0 ∧ -p_72) -> ( b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0)
c  in CNF:
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨  b^{12, 7}_2
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨  b^{12, 7}_1
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨  p_72 ∨ -b^{12, 7}_0
c  in DIMACS:
-11720  11721 -11722  72  11723 0
-11720  11721 -11722  72  11724 0
-11720  11721 -11722  72 -11725 0

c  -2-1 --> break 
c    ( b^{12, 6}_2 ∧  b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨  b^{12, 6}_0 ∨  p_72 ∨ break
c  in DIMACS:
-11720 -11721  11722  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 6}_2 ∧ -b^{12, 6}_1 ∧ -b^{12, 6}_0 ∧ true) 
c  in CNF:
c    -b^{12, 6}_2 ∨  b^{12, 6}_1 ∨  b^{12, 6}_0 ∨ false 
c  in DIMACS:
-11720  11721  11722  0

c  3 does not represent an automaton state.
c    -(-b^{12, 6}_2 ∧  b^{12, 6}_1 ∧  b^{12, 6}_0 ∧ true) 
c  in CNF:
c     b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ false 
c  in DIMACS:
 11720 -11721 -11722  0
c  -3 does not represent an automaton state.
c    -( b^{12, 6}_2 ∧  b^{12, 6}_1 ∧  b^{12, 6}_0 ∧ true) 
c  in CNF:
c    -b^{12, 6}_2 ∨ -b^{12, 6}_1 ∨ -b^{12, 6}_0 ∨ false 
c  in DIMACS:
-11720 -11721 -11722  0

c i = 7
c  -2+1 --> -1
c    ( b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧  p_84) -> ( b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0)
c  in CNF:
c    -b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨  b^{12, 8}_2
c    -b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_1
c    -b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨  b^{12, 8}_0
c  in DIMACS:
-11723 -11724  11725 -84  11726 0
-11723 -11724  11725 -84 -11727 0
-11723 -11724  11725 -84  11728 0

c  -1+1 --> 0
c    ( b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0 ∧  p_84) -> (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧ -b^{12, 8}_0)
c  in CNF:
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_2
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_1
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_0
c  in DIMACS:
-11723  11724 -11725 -84 -11726 0
-11723  11724 -11725 -84 -11727 0
-11723  11724 -11725 -84 -11728 0

c  0+1 --> 1
c    (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧  p_84) -> (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0)
c  in CNF:
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_2
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_1
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨  b^{12, 8}_0
c  in DIMACS:
 11723  11724  11725 -84 -11726 0
 11723  11724  11725 -84 -11727 0
 11723  11724  11725 -84  11728 0

c  1+1 --> 2
c    (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0 ∧  p_84) -> (-b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0)
c  in CNF:
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_2
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨  b^{12, 8}_1
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ -p_84 ∨ -b^{12, 8}_0
c  in DIMACS:
 11723  11724 -11725 -84 -11726 0
 11723  11724 -11725 -84  11727 0
 11723  11724 -11725 -84 -11728 0

c  2+1 --> break 
c    (-b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧  p_84) -> break
c  in CNF:
c     b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 11723 -11724  11725 -84 1162 0


c  2-1 --> 1
c    (-b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧ -p_84) -> (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0)
c  in CNF:
c     b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_2
c     b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_1
c     b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨  b^{12, 8}_0
c  in DIMACS:
 11723 -11724  11725  84 -11726 0
 11723 -11724  11725  84 -11727 0
 11723 -11724  11725  84  11728 0

c  1-1 --> 0
c    (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0 ∧ -p_84) -> (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧ -b^{12, 8}_0)
c  in CNF:
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_2
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_1
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_0
c  in DIMACS:
 11723  11724 -11725  84 -11726 0
 11723  11724 -11725  84 -11727 0
 11723  11724 -11725  84 -11728 0

c  0-1 --> -1
c    (-b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧ -p_84) -> ( b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0)
c  in CNF:
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨  b^{12, 8}_2
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_1
c     b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨  b^{12, 8}_0
c  in DIMACS:
 11723  11724  11725  84  11726 0
 11723  11724  11725  84 -11727 0
 11723  11724  11725  84  11728 0

c  -1-1 --> -2
c    ( b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧  b^{12, 7}_0 ∧ -p_84) -> ( b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0)
c  in CNF:
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨  b^{12, 8}_2
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨  b^{12, 8}_1
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨  p_84 ∨ -b^{12, 8}_0
c  in DIMACS:
-11723  11724 -11725  84  11726 0
-11723  11724 -11725  84  11727 0
-11723  11724 -11725  84 -11728 0

c  -2-1 --> break 
c    ( b^{12, 7}_2 ∧  b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨  b^{12, 7}_0 ∨  p_84 ∨ break
c  in DIMACS:
-11723 -11724  11725  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 7}_2 ∧ -b^{12, 7}_1 ∧ -b^{12, 7}_0 ∧ true) 
c  in CNF:
c    -b^{12, 7}_2 ∨  b^{12, 7}_1 ∨  b^{12, 7}_0 ∨ false 
c  in DIMACS:
-11723  11724  11725  0

c  3 does not represent an automaton state.
c    -(-b^{12, 7}_2 ∧  b^{12, 7}_1 ∧  b^{12, 7}_0 ∧ true) 
c  in CNF:
c     b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ false 
c  in DIMACS:
 11723 -11724 -11725  0
c  -3 does not represent an automaton state.
c    -( b^{12, 7}_2 ∧  b^{12, 7}_1 ∧  b^{12, 7}_0 ∧ true) 
c  in CNF:
c    -b^{12, 7}_2 ∨ -b^{12, 7}_1 ∨ -b^{12, 7}_0 ∨ false 
c  in DIMACS:
-11723 -11724 -11725  0

c i = 8
c  -2+1 --> -1
c    ( b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧  p_96) -> ( b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0)
c  in CNF:
c    -b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨  b^{12, 9}_2
c    -b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_1
c    -b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨  b^{12, 9}_0
c  in DIMACS:
-11726 -11727  11728 -96  11729 0
-11726 -11727  11728 -96 -11730 0
-11726 -11727  11728 -96  11731 0

c  -1+1 --> 0
c    ( b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0 ∧  p_96) -> (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧ -b^{12, 9}_0)
c  in CNF:
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_2
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_1
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_0
c  in DIMACS:
-11726  11727 -11728 -96 -11729 0
-11726  11727 -11728 -96 -11730 0
-11726  11727 -11728 -96 -11731 0

c  0+1 --> 1
c    (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧  p_96) -> (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0)
c  in CNF:
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_2
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_1
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨  b^{12, 9}_0
c  in DIMACS:
 11726  11727  11728 -96 -11729 0
 11726  11727  11728 -96 -11730 0
 11726  11727  11728 -96  11731 0

c  1+1 --> 2
c    (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0 ∧  p_96) -> (-b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0)
c  in CNF:
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_2
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨  b^{12, 9}_1
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ -p_96 ∨ -b^{12, 9}_0
c  in DIMACS:
 11726  11727 -11728 -96 -11729 0
 11726  11727 -11728 -96  11730 0
 11726  11727 -11728 -96 -11731 0

c  2+1 --> break 
c    (-b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧  p_96) -> break
c  in CNF:
c     b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 11726 -11727  11728 -96 1162 0


c  2-1 --> 1
c    (-b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧ -p_96) -> (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0)
c  in CNF:
c     b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_2
c     b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_1
c     b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨  b^{12, 9}_0
c  in DIMACS:
 11726 -11727  11728  96 -11729 0
 11726 -11727  11728  96 -11730 0
 11726 -11727  11728  96  11731 0

c  1-1 --> 0
c    (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0 ∧ -p_96) -> (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧ -b^{12, 9}_0)
c  in CNF:
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_2
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_1
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_0
c  in DIMACS:
 11726  11727 -11728  96 -11729 0
 11726  11727 -11728  96 -11730 0
 11726  11727 -11728  96 -11731 0

c  0-1 --> -1
c    (-b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧ -p_96) -> ( b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0)
c  in CNF:
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨  b^{12, 9}_2
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_1
c     b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨  b^{12, 9}_0
c  in DIMACS:
 11726  11727  11728  96  11729 0
 11726  11727  11728  96 -11730 0
 11726  11727  11728  96  11731 0

c  -1-1 --> -2
c    ( b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧  b^{12, 8}_0 ∧ -p_96) -> ( b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0)
c  in CNF:
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨  b^{12, 9}_2
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨  b^{12, 9}_1
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨  p_96 ∨ -b^{12, 9}_0
c  in DIMACS:
-11726  11727 -11728  96  11729 0
-11726  11727 -11728  96  11730 0
-11726  11727 -11728  96 -11731 0

c  -2-1 --> break 
c    ( b^{12, 8}_2 ∧  b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨  b^{12, 8}_0 ∨  p_96 ∨ break
c  in DIMACS:
-11726 -11727  11728  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 8}_2 ∧ -b^{12, 8}_1 ∧ -b^{12, 8}_0 ∧ true) 
c  in CNF:
c    -b^{12, 8}_2 ∨  b^{12, 8}_1 ∨  b^{12, 8}_0 ∨ false 
c  in DIMACS:
-11726  11727  11728  0

c  3 does not represent an automaton state.
c    -(-b^{12, 8}_2 ∧  b^{12, 8}_1 ∧  b^{12, 8}_0 ∧ true) 
c  in CNF:
c     b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ false 
c  in DIMACS:
 11726 -11727 -11728  0
c  -3 does not represent an automaton state.
c    -( b^{12, 8}_2 ∧  b^{12, 8}_1 ∧  b^{12, 8}_0 ∧ true) 
c  in CNF:
c    -b^{12, 8}_2 ∨ -b^{12, 8}_1 ∨ -b^{12, 8}_0 ∨ false 
c  in DIMACS:
-11726 -11727 -11728  0

c i = 9
c  -2+1 --> -1
c    ( b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧  p_108) -> ( b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0)
c  in CNF:
c    -b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨  b^{12, 10}_2
c    -b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_1
c    -b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨  b^{12, 10}_0
c  in DIMACS:
-11729 -11730  11731 -108  11732 0
-11729 -11730  11731 -108 -11733 0
-11729 -11730  11731 -108  11734 0

c  -1+1 --> 0
c    ( b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0 ∧  p_108) -> (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧ -b^{12, 10}_0)
c  in CNF:
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_2
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_1
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_0
c  in DIMACS:
-11729  11730 -11731 -108 -11732 0
-11729  11730 -11731 -108 -11733 0
-11729  11730 -11731 -108 -11734 0

c  0+1 --> 1
c    (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧  p_108) -> (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0)
c  in CNF:
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_2
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_1
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨  b^{12, 10}_0
c  in DIMACS:
 11729  11730  11731 -108 -11732 0
 11729  11730  11731 -108 -11733 0
 11729  11730  11731 -108  11734 0

c  1+1 --> 2
c    (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0 ∧  p_108) -> (-b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0)
c  in CNF:
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_2
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨  b^{12, 10}_1
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ -p_108 ∨ -b^{12, 10}_0
c  in DIMACS:
 11729  11730 -11731 -108 -11732 0
 11729  11730 -11731 -108  11733 0
 11729  11730 -11731 -108 -11734 0

c  2+1 --> break 
c    (-b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧  p_108) -> break
c  in CNF:
c     b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 11729 -11730  11731 -108 1162 0


c  2-1 --> 1
c    (-b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧ -p_108) -> (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0)
c  in CNF:
c     b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_2
c     b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_1
c     b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨  b^{12, 10}_0
c  in DIMACS:
 11729 -11730  11731  108 -11732 0
 11729 -11730  11731  108 -11733 0
 11729 -11730  11731  108  11734 0

c  1-1 --> 0
c    (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0 ∧ -p_108) -> (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧ -b^{12, 10}_0)
c  in CNF:
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_2
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_1
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_0
c  in DIMACS:
 11729  11730 -11731  108 -11732 0
 11729  11730 -11731  108 -11733 0
 11729  11730 -11731  108 -11734 0

c  0-1 --> -1
c    (-b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧ -p_108) -> ( b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0)
c  in CNF:
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨  b^{12, 10}_2
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_1
c     b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨  b^{12, 10}_0
c  in DIMACS:
 11729  11730  11731  108  11732 0
 11729  11730  11731  108 -11733 0
 11729  11730  11731  108  11734 0

c  -1-1 --> -2
c    ( b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧  b^{12, 9}_0 ∧ -p_108) -> ( b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0)
c  in CNF:
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨  b^{12, 10}_2
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨  b^{12, 10}_1
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨  p_108 ∨ -b^{12, 10}_0
c  in DIMACS:
-11729  11730 -11731  108  11732 0
-11729  11730 -11731  108  11733 0
-11729  11730 -11731  108 -11734 0

c  -2-1 --> break 
c    ( b^{12, 9}_2 ∧  b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨  b^{12, 9}_0 ∨  p_108 ∨ break
c  in DIMACS:
-11729 -11730  11731  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 9}_2 ∧ -b^{12, 9}_1 ∧ -b^{12, 9}_0 ∧ true) 
c  in CNF:
c    -b^{12, 9}_2 ∨  b^{12, 9}_1 ∨  b^{12, 9}_0 ∨ false 
c  in DIMACS:
-11729  11730  11731  0

c  3 does not represent an automaton state.
c    -(-b^{12, 9}_2 ∧  b^{12, 9}_1 ∧  b^{12, 9}_0 ∧ true) 
c  in CNF:
c     b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ false 
c  in DIMACS:
 11729 -11730 -11731  0
c  -3 does not represent an automaton state.
c    -( b^{12, 9}_2 ∧  b^{12, 9}_1 ∧  b^{12, 9}_0 ∧ true) 
c  in CNF:
c    -b^{12, 9}_2 ∨ -b^{12, 9}_1 ∨ -b^{12, 9}_0 ∨ false 
c  in DIMACS:
-11729 -11730 -11731  0

c i = 10
c  -2+1 --> -1
c    ( b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧  p_120) -> ( b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0)
c  in CNF:
c    -b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨  b^{12, 11}_2
c    -b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_1
c    -b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨  b^{12, 11}_0
c  in DIMACS:
-11732 -11733  11734 -120  11735 0
-11732 -11733  11734 -120 -11736 0
-11732 -11733  11734 -120  11737 0

c  -1+1 --> 0
c    ( b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0 ∧  p_120) -> (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧ -b^{12, 11}_0)
c  in CNF:
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_2
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_1
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_0
c  in DIMACS:
-11732  11733 -11734 -120 -11735 0
-11732  11733 -11734 -120 -11736 0
-11732  11733 -11734 -120 -11737 0

c  0+1 --> 1
c    (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧  p_120) -> (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0)
c  in CNF:
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_2
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_1
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨  b^{12, 11}_0
c  in DIMACS:
 11732  11733  11734 -120 -11735 0
 11732  11733  11734 -120 -11736 0
 11732  11733  11734 -120  11737 0

c  1+1 --> 2
c    (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0 ∧  p_120) -> (-b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0)
c  in CNF:
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_2
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨  b^{12, 11}_1
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ -p_120 ∨ -b^{12, 11}_0
c  in DIMACS:
 11732  11733 -11734 -120 -11735 0
 11732  11733 -11734 -120  11736 0
 11732  11733 -11734 -120 -11737 0

c  2+1 --> break 
c    (-b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧  p_120) -> break
c  in CNF:
c     b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 11732 -11733  11734 -120 1162 0


c  2-1 --> 1
c    (-b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧ -p_120) -> (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0)
c  in CNF:
c     b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_2
c     b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_1
c     b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨  b^{12, 11}_0
c  in DIMACS:
 11732 -11733  11734  120 -11735 0
 11732 -11733  11734  120 -11736 0
 11732 -11733  11734  120  11737 0

c  1-1 --> 0
c    (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0 ∧ -p_120) -> (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧ -b^{12, 11}_0)
c  in CNF:
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_2
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_1
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_0
c  in DIMACS:
 11732  11733 -11734  120 -11735 0
 11732  11733 -11734  120 -11736 0
 11732  11733 -11734  120 -11737 0

c  0-1 --> -1
c    (-b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧ -p_120) -> ( b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0)
c  in CNF:
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨  b^{12, 11}_2
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_1
c     b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨  b^{12, 11}_0
c  in DIMACS:
 11732  11733  11734  120  11735 0
 11732  11733  11734  120 -11736 0
 11732  11733  11734  120  11737 0

c  -1-1 --> -2
c    ( b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧  b^{12, 10}_0 ∧ -p_120) -> ( b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0)
c  in CNF:
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨  b^{12, 11}_2
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨  b^{12, 11}_1
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨  p_120 ∨ -b^{12, 11}_0
c  in DIMACS:
-11732  11733 -11734  120  11735 0
-11732  11733 -11734  120  11736 0
-11732  11733 -11734  120 -11737 0

c  -2-1 --> break 
c    ( b^{12, 10}_2 ∧  b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨  b^{12, 10}_0 ∨  p_120 ∨ break
c  in DIMACS:
-11732 -11733  11734  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 10}_2 ∧ -b^{12, 10}_1 ∧ -b^{12, 10}_0 ∧ true) 
c  in CNF:
c    -b^{12, 10}_2 ∨  b^{12, 10}_1 ∨  b^{12, 10}_0 ∨ false 
c  in DIMACS:
-11732  11733  11734  0

c  3 does not represent an automaton state.
c    -(-b^{12, 10}_2 ∧  b^{12, 10}_1 ∧  b^{12, 10}_0 ∧ true) 
c  in CNF:
c     b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ false 
c  in DIMACS:
 11732 -11733 -11734  0
c  -3 does not represent an automaton state.
c    -( b^{12, 10}_2 ∧  b^{12, 10}_1 ∧  b^{12, 10}_0 ∧ true) 
c  in CNF:
c    -b^{12, 10}_2 ∨ -b^{12, 10}_1 ∨ -b^{12, 10}_0 ∨ false 
c  in DIMACS:
-11732 -11733 -11734  0

c i = 11
c  -2+1 --> -1
c    ( b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧  p_132) -> ( b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0)
c  in CNF:
c    -b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨  b^{12, 12}_2
c    -b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_1
c    -b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨  b^{12, 12}_0
c  in DIMACS:
-11735 -11736  11737 -132  11738 0
-11735 -11736  11737 -132 -11739 0
-11735 -11736  11737 -132  11740 0

c  -1+1 --> 0
c    ( b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0 ∧  p_132) -> (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧ -b^{12, 12}_0)
c  in CNF:
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_2
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_1
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_0
c  in DIMACS:
-11735  11736 -11737 -132 -11738 0
-11735  11736 -11737 -132 -11739 0
-11735  11736 -11737 -132 -11740 0

c  0+1 --> 1
c    (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧  p_132) -> (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0)
c  in CNF:
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_2
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_1
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨  b^{12, 12}_0
c  in DIMACS:
 11735  11736  11737 -132 -11738 0
 11735  11736  11737 -132 -11739 0
 11735  11736  11737 -132  11740 0

c  1+1 --> 2
c    (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0 ∧  p_132) -> (-b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0)
c  in CNF:
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_2
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨  b^{12, 12}_1
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ -p_132 ∨ -b^{12, 12}_0
c  in DIMACS:
 11735  11736 -11737 -132 -11738 0
 11735  11736 -11737 -132  11739 0
 11735  11736 -11737 -132 -11740 0

c  2+1 --> break 
c    (-b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧  p_132) -> break
c  in CNF:
c     b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 11735 -11736  11737 -132 1162 0


c  2-1 --> 1
c    (-b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧ -p_132) -> (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0)
c  in CNF:
c     b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_2
c     b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_1
c     b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨  b^{12, 12}_0
c  in DIMACS:
 11735 -11736  11737  132 -11738 0
 11735 -11736  11737  132 -11739 0
 11735 -11736  11737  132  11740 0

c  1-1 --> 0
c    (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0 ∧ -p_132) -> (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧ -b^{12, 12}_0)
c  in CNF:
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_2
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_1
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_0
c  in DIMACS:
 11735  11736 -11737  132 -11738 0
 11735  11736 -11737  132 -11739 0
 11735  11736 -11737  132 -11740 0

c  0-1 --> -1
c    (-b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧ -p_132) -> ( b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0)
c  in CNF:
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨  b^{12, 12}_2
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_1
c     b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨  b^{12, 12}_0
c  in DIMACS:
 11735  11736  11737  132  11738 0
 11735  11736  11737  132 -11739 0
 11735  11736  11737  132  11740 0

c  -1-1 --> -2
c    ( b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧  b^{12, 11}_0 ∧ -p_132) -> ( b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0)
c  in CNF:
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨  b^{12, 12}_2
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨  b^{12, 12}_1
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨  p_132 ∨ -b^{12, 12}_0
c  in DIMACS:
-11735  11736 -11737  132  11738 0
-11735  11736 -11737  132  11739 0
-11735  11736 -11737  132 -11740 0

c  -2-1 --> break 
c    ( b^{12, 11}_2 ∧  b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨  b^{12, 11}_0 ∨  p_132 ∨ break
c  in DIMACS:
-11735 -11736  11737  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 11}_2 ∧ -b^{12, 11}_1 ∧ -b^{12, 11}_0 ∧ true) 
c  in CNF:
c    -b^{12, 11}_2 ∨  b^{12, 11}_1 ∨  b^{12, 11}_0 ∨ false 
c  in DIMACS:
-11735  11736  11737  0

c  3 does not represent an automaton state.
c    -(-b^{12, 11}_2 ∧  b^{12, 11}_1 ∧  b^{12, 11}_0 ∧ true) 
c  in CNF:
c     b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ false 
c  in DIMACS:
 11735 -11736 -11737  0
c  -3 does not represent an automaton state.
c    -( b^{12, 11}_2 ∧  b^{12, 11}_1 ∧  b^{12, 11}_0 ∧ true) 
c  in CNF:
c    -b^{12, 11}_2 ∨ -b^{12, 11}_1 ∨ -b^{12, 11}_0 ∨ false 
c  in DIMACS:
-11735 -11736 -11737  0

c i = 12
c  -2+1 --> -1
c    ( b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧  p_144) -> ( b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0)
c  in CNF:
c    -b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨  b^{12, 13}_2
c    -b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_1
c    -b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨  b^{12, 13}_0
c  in DIMACS:
-11738 -11739  11740 -144  11741 0
-11738 -11739  11740 -144 -11742 0
-11738 -11739  11740 -144  11743 0

c  -1+1 --> 0
c    ( b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0 ∧  p_144) -> (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧ -b^{12, 13}_0)
c  in CNF:
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_2
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_1
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_0
c  in DIMACS:
-11738  11739 -11740 -144 -11741 0
-11738  11739 -11740 -144 -11742 0
-11738  11739 -11740 -144 -11743 0

c  0+1 --> 1
c    (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧  p_144) -> (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0)
c  in CNF:
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_2
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_1
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨  b^{12, 13}_0
c  in DIMACS:
 11738  11739  11740 -144 -11741 0
 11738  11739  11740 -144 -11742 0
 11738  11739  11740 -144  11743 0

c  1+1 --> 2
c    (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0 ∧  p_144) -> (-b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0)
c  in CNF:
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_2
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨  b^{12, 13}_1
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ -p_144 ∨ -b^{12, 13}_0
c  in DIMACS:
 11738  11739 -11740 -144 -11741 0
 11738  11739 -11740 -144  11742 0
 11738  11739 -11740 -144 -11743 0

c  2+1 --> break 
c    (-b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧  p_144) -> break
c  in CNF:
c     b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 11738 -11739  11740 -144 1162 0


c  2-1 --> 1
c    (-b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧ -p_144) -> (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0)
c  in CNF:
c     b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_2
c     b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_1
c     b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨  b^{12, 13}_0
c  in DIMACS:
 11738 -11739  11740  144 -11741 0
 11738 -11739  11740  144 -11742 0
 11738 -11739  11740  144  11743 0

c  1-1 --> 0
c    (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0 ∧ -p_144) -> (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧ -b^{12, 13}_0)
c  in CNF:
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_2
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_1
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_0
c  in DIMACS:
 11738  11739 -11740  144 -11741 0
 11738  11739 -11740  144 -11742 0
 11738  11739 -11740  144 -11743 0

c  0-1 --> -1
c    (-b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧ -p_144) -> ( b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0)
c  in CNF:
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨  b^{12, 13}_2
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_1
c     b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨  b^{12, 13}_0
c  in DIMACS:
 11738  11739  11740  144  11741 0
 11738  11739  11740  144 -11742 0
 11738  11739  11740  144  11743 0

c  -1-1 --> -2
c    ( b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧  b^{12, 12}_0 ∧ -p_144) -> ( b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0)
c  in CNF:
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨  b^{12, 13}_2
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨  b^{12, 13}_1
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨  p_144 ∨ -b^{12, 13}_0
c  in DIMACS:
-11738  11739 -11740  144  11741 0
-11738  11739 -11740  144  11742 0
-11738  11739 -11740  144 -11743 0

c  -2-1 --> break 
c    ( b^{12, 12}_2 ∧  b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨  b^{12, 12}_0 ∨  p_144 ∨ break
c  in DIMACS:
-11738 -11739  11740  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 12}_2 ∧ -b^{12, 12}_1 ∧ -b^{12, 12}_0 ∧ true) 
c  in CNF:
c    -b^{12, 12}_2 ∨  b^{12, 12}_1 ∨  b^{12, 12}_0 ∨ false 
c  in DIMACS:
-11738  11739  11740  0

c  3 does not represent an automaton state.
c    -(-b^{12, 12}_2 ∧  b^{12, 12}_1 ∧  b^{12, 12}_0 ∧ true) 
c  in CNF:
c     b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ false 
c  in DIMACS:
 11738 -11739 -11740  0
c  -3 does not represent an automaton state.
c    -( b^{12, 12}_2 ∧  b^{12, 12}_1 ∧  b^{12, 12}_0 ∧ true) 
c  in CNF:
c    -b^{12, 12}_2 ∨ -b^{12, 12}_1 ∨ -b^{12, 12}_0 ∨ false 
c  in DIMACS:
-11738 -11739 -11740  0

c i = 13
c  -2+1 --> -1
c    ( b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧  p_156) -> ( b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0)
c  in CNF:
c    -b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨  b^{12, 14}_2
c    -b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_1
c    -b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨  b^{12, 14}_0
c  in DIMACS:
-11741 -11742  11743 -156  11744 0
-11741 -11742  11743 -156 -11745 0
-11741 -11742  11743 -156  11746 0

c  -1+1 --> 0
c    ( b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0 ∧  p_156) -> (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧ -b^{12, 14}_0)
c  in CNF:
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_2
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_1
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_0
c  in DIMACS:
-11741  11742 -11743 -156 -11744 0
-11741  11742 -11743 -156 -11745 0
-11741  11742 -11743 -156 -11746 0

c  0+1 --> 1
c    (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧  p_156) -> (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0)
c  in CNF:
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_2
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_1
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨  b^{12, 14}_0
c  in DIMACS:
 11741  11742  11743 -156 -11744 0
 11741  11742  11743 -156 -11745 0
 11741  11742  11743 -156  11746 0

c  1+1 --> 2
c    (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0 ∧  p_156) -> (-b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0)
c  in CNF:
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_2
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨  b^{12, 14}_1
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ -p_156 ∨ -b^{12, 14}_0
c  in DIMACS:
 11741  11742 -11743 -156 -11744 0
 11741  11742 -11743 -156  11745 0
 11741  11742 -11743 -156 -11746 0

c  2+1 --> break 
c    (-b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧  p_156) -> break
c  in CNF:
c     b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 11741 -11742  11743 -156 1162 0


c  2-1 --> 1
c    (-b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧ -p_156) -> (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0)
c  in CNF:
c     b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_2
c     b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_1
c     b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨  b^{12, 14}_0
c  in DIMACS:
 11741 -11742  11743  156 -11744 0
 11741 -11742  11743  156 -11745 0
 11741 -11742  11743  156  11746 0

c  1-1 --> 0
c    (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0 ∧ -p_156) -> (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧ -b^{12, 14}_0)
c  in CNF:
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_2
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_1
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_0
c  in DIMACS:
 11741  11742 -11743  156 -11744 0
 11741  11742 -11743  156 -11745 0
 11741  11742 -11743  156 -11746 0

c  0-1 --> -1
c    (-b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧ -p_156) -> ( b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0)
c  in CNF:
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨  b^{12, 14}_2
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_1
c     b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨  b^{12, 14}_0
c  in DIMACS:
 11741  11742  11743  156  11744 0
 11741  11742  11743  156 -11745 0
 11741  11742  11743  156  11746 0

c  -1-1 --> -2
c    ( b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧  b^{12, 13}_0 ∧ -p_156) -> ( b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0)
c  in CNF:
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨  b^{12, 14}_2
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨  b^{12, 14}_1
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨  p_156 ∨ -b^{12, 14}_0
c  in DIMACS:
-11741  11742 -11743  156  11744 0
-11741  11742 -11743  156  11745 0
-11741  11742 -11743  156 -11746 0

c  -2-1 --> break 
c    ( b^{12, 13}_2 ∧  b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨  b^{12, 13}_0 ∨  p_156 ∨ break
c  in DIMACS:
-11741 -11742  11743  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 13}_2 ∧ -b^{12, 13}_1 ∧ -b^{12, 13}_0 ∧ true) 
c  in CNF:
c    -b^{12, 13}_2 ∨  b^{12, 13}_1 ∨  b^{12, 13}_0 ∨ false 
c  in DIMACS:
-11741  11742  11743  0

c  3 does not represent an automaton state.
c    -(-b^{12, 13}_2 ∧  b^{12, 13}_1 ∧  b^{12, 13}_0 ∧ true) 
c  in CNF:
c     b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ false 
c  in DIMACS:
 11741 -11742 -11743  0
c  -3 does not represent an automaton state.
c    -( b^{12, 13}_2 ∧  b^{12, 13}_1 ∧  b^{12, 13}_0 ∧ true) 
c  in CNF:
c    -b^{12, 13}_2 ∨ -b^{12, 13}_1 ∨ -b^{12, 13}_0 ∨ false 
c  in DIMACS:
-11741 -11742 -11743  0

c i = 14
c  -2+1 --> -1
c    ( b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧  p_168) -> ( b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0)
c  in CNF:
c    -b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨  b^{12, 15}_2
c    -b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_1
c    -b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨  b^{12, 15}_0
c  in DIMACS:
-11744 -11745  11746 -168  11747 0
-11744 -11745  11746 -168 -11748 0
-11744 -11745  11746 -168  11749 0

c  -1+1 --> 0
c    ( b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0 ∧  p_168) -> (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧ -b^{12, 15}_0)
c  in CNF:
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_2
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_1
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_0
c  in DIMACS:
-11744  11745 -11746 -168 -11747 0
-11744  11745 -11746 -168 -11748 0
-11744  11745 -11746 -168 -11749 0

c  0+1 --> 1
c    (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧  p_168) -> (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0)
c  in CNF:
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_2
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_1
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨  b^{12, 15}_0
c  in DIMACS:
 11744  11745  11746 -168 -11747 0
 11744  11745  11746 -168 -11748 0
 11744  11745  11746 -168  11749 0

c  1+1 --> 2
c    (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0 ∧  p_168) -> (-b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0)
c  in CNF:
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_2
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨  b^{12, 15}_1
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ -p_168 ∨ -b^{12, 15}_0
c  in DIMACS:
 11744  11745 -11746 -168 -11747 0
 11744  11745 -11746 -168  11748 0
 11744  11745 -11746 -168 -11749 0

c  2+1 --> break 
c    (-b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧  p_168) -> break
c  in CNF:
c     b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 11744 -11745  11746 -168 1162 0


c  2-1 --> 1
c    (-b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧ -p_168) -> (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0)
c  in CNF:
c     b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_2
c     b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_1
c     b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨  b^{12, 15}_0
c  in DIMACS:
 11744 -11745  11746  168 -11747 0
 11744 -11745  11746  168 -11748 0
 11744 -11745  11746  168  11749 0

c  1-1 --> 0
c    (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0 ∧ -p_168) -> (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧ -b^{12, 15}_0)
c  in CNF:
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_2
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_1
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_0
c  in DIMACS:
 11744  11745 -11746  168 -11747 0
 11744  11745 -11746  168 -11748 0
 11744  11745 -11746  168 -11749 0

c  0-1 --> -1
c    (-b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧ -p_168) -> ( b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0)
c  in CNF:
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨  b^{12, 15}_2
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_1
c     b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨  b^{12, 15}_0
c  in DIMACS:
 11744  11745  11746  168  11747 0
 11744  11745  11746  168 -11748 0
 11744  11745  11746  168  11749 0

c  -1-1 --> -2
c    ( b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧  b^{12, 14}_0 ∧ -p_168) -> ( b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0)
c  in CNF:
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨  b^{12, 15}_2
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨  b^{12, 15}_1
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨  p_168 ∨ -b^{12, 15}_0
c  in DIMACS:
-11744  11745 -11746  168  11747 0
-11744  11745 -11746  168  11748 0
-11744  11745 -11746  168 -11749 0

c  -2-1 --> break 
c    ( b^{12, 14}_2 ∧  b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨  b^{12, 14}_0 ∨  p_168 ∨ break
c  in DIMACS:
-11744 -11745  11746  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 14}_2 ∧ -b^{12, 14}_1 ∧ -b^{12, 14}_0 ∧ true) 
c  in CNF:
c    -b^{12, 14}_2 ∨  b^{12, 14}_1 ∨  b^{12, 14}_0 ∨ false 
c  in DIMACS:
-11744  11745  11746  0

c  3 does not represent an automaton state.
c    -(-b^{12, 14}_2 ∧  b^{12, 14}_1 ∧  b^{12, 14}_0 ∧ true) 
c  in CNF:
c     b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ false 
c  in DIMACS:
 11744 -11745 -11746  0
c  -3 does not represent an automaton state.
c    -( b^{12, 14}_2 ∧  b^{12, 14}_1 ∧  b^{12, 14}_0 ∧ true) 
c  in CNF:
c    -b^{12, 14}_2 ∨ -b^{12, 14}_1 ∨ -b^{12, 14}_0 ∨ false 
c  in DIMACS:
-11744 -11745 -11746  0

c i = 15
c  -2+1 --> -1
c    ( b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧  p_180) -> ( b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0)
c  in CNF:
c    -b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨  b^{12, 16}_2
c    -b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_1
c    -b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨  b^{12, 16}_0
c  in DIMACS:
-11747 -11748  11749 -180  11750 0
-11747 -11748  11749 -180 -11751 0
-11747 -11748  11749 -180  11752 0

c  -1+1 --> 0
c    ( b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0 ∧  p_180) -> (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧ -b^{12, 16}_0)
c  in CNF:
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_2
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_1
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_0
c  in DIMACS:
-11747  11748 -11749 -180 -11750 0
-11747  11748 -11749 -180 -11751 0
-11747  11748 -11749 -180 -11752 0

c  0+1 --> 1
c    (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧  p_180) -> (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0)
c  in CNF:
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_2
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_1
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨  b^{12, 16}_0
c  in DIMACS:
 11747  11748  11749 -180 -11750 0
 11747  11748  11749 -180 -11751 0
 11747  11748  11749 -180  11752 0

c  1+1 --> 2
c    (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0 ∧  p_180) -> (-b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0)
c  in CNF:
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_2
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨  b^{12, 16}_1
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ -p_180 ∨ -b^{12, 16}_0
c  in DIMACS:
 11747  11748 -11749 -180 -11750 0
 11747  11748 -11749 -180  11751 0
 11747  11748 -11749 -180 -11752 0

c  2+1 --> break 
c    (-b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧  p_180) -> break
c  in CNF:
c     b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 11747 -11748  11749 -180 1162 0


c  2-1 --> 1
c    (-b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧ -p_180) -> (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0)
c  in CNF:
c     b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_2
c     b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_1
c     b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨  b^{12, 16}_0
c  in DIMACS:
 11747 -11748  11749  180 -11750 0
 11747 -11748  11749  180 -11751 0
 11747 -11748  11749  180  11752 0

c  1-1 --> 0
c    (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0 ∧ -p_180) -> (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧ -b^{12, 16}_0)
c  in CNF:
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_2
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_1
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_0
c  in DIMACS:
 11747  11748 -11749  180 -11750 0
 11747  11748 -11749  180 -11751 0
 11747  11748 -11749  180 -11752 0

c  0-1 --> -1
c    (-b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧ -p_180) -> ( b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0)
c  in CNF:
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨  b^{12, 16}_2
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_1
c     b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨  b^{12, 16}_0
c  in DIMACS:
 11747  11748  11749  180  11750 0
 11747  11748  11749  180 -11751 0
 11747  11748  11749  180  11752 0

c  -1-1 --> -2
c    ( b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧  b^{12, 15}_0 ∧ -p_180) -> ( b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0)
c  in CNF:
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨  b^{12, 16}_2
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨  b^{12, 16}_1
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨  p_180 ∨ -b^{12, 16}_0
c  in DIMACS:
-11747  11748 -11749  180  11750 0
-11747  11748 -11749  180  11751 0
-11747  11748 -11749  180 -11752 0

c  -2-1 --> break 
c    ( b^{12, 15}_2 ∧  b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨  b^{12, 15}_0 ∨  p_180 ∨ break
c  in DIMACS:
-11747 -11748  11749  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 15}_2 ∧ -b^{12, 15}_1 ∧ -b^{12, 15}_0 ∧ true) 
c  in CNF:
c    -b^{12, 15}_2 ∨  b^{12, 15}_1 ∨  b^{12, 15}_0 ∨ false 
c  in DIMACS:
-11747  11748  11749  0

c  3 does not represent an automaton state.
c    -(-b^{12, 15}_2 ∧  b^{12, 15}_1 ∧  b^{12, 15}_0 ∧ true) 
c  in CNF:
c     b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ false 
c  in DIMACS:
 11747 -11748 -11749  0
c  -3 does not represent an automaton state.
c    -( b^{12, 15}_2 ∧  b^{12, 15}_1 ∧  b^{12, 15}_0 ∧ true) 
c  in CNF:
c    -b^{12, 15}_2 ∨ -b^{12, 15}_1 ∨ -b^{12, 15}_0 ∨ false 
c  in DIMACS:
-11747 -11748 -11749  0

c i = 16
c  -2+1 --> -1
c    ( b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧  p_192) -> ( b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0)
c  in CNF:
c    -b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨  b^{12, 17}_2
c    -b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_1
c    -b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨  b^{12, 17}_0
c  in DIMACS:
-11750 -11751  11752 -192  11753 0
-11750 -11751  11752 -192 -11754 0
-11750 -11751  11752 -192  11755 0

c  -1+1 --> 0
c    ( b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0 ∧  p_192) -> (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧ -b^{12, 17}_0)
c  in CNF:
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_2
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_1
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_0
c  in DIMACS:
-11750  11751 -11752 -192 -11753 0
-11750  11751 -11752 -192 -11754 0
-11750  11751 -11752 -192 -11755 0

c  0+1 --> 1
c    (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧  p_192) -> (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0)
c  in CNF:
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_2
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_1
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨  b^{12, 17}_0
c  in DIMACS:
 11750  11751  11752 -192 -11753 0
 11750  11751  11752 -192 -11754 0
 11750  11751  11752 -192  11755 0

c  1+1 --> 2
c    (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0 ∧  p_192) -> (-b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0)
c  in CNF:
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_2
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨  b^{12, 17}_1
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ -p_192 ∨ -b^{12, 17}_0
c  in DIMACS:
 11750  11751 -11752 -192 -11753 0
 11750  11751 -11752 -192  11754 0
 11750  11751 -11752 -192 -11755 0

c  2+1 --> break 
c    (-b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧  p_192) -> break
c  in CNF:
c     b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 11750 -11751  11752 -192 1162 0


c  2-1 --> 1
c    (-b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧ -p_192) -> (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0)
c  in CNF:
c     b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_2
c     b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_1
c     b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨  b^{12, 17}_0
c  in DIMACS:
 11750 -11751  11752  192 -11753 0
 11750 -11751  11752  192 -11754 0
 11750 -11751  11752  192  11755 0

c  1-1 --> 0
c    (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0 ∧ -p_192) -> (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧ -b^{12, 17}_0)
c  in CNF:
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_2
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_1
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_0
c  in DIMACS:
 11750  11751 -11752  192 -11753 0
 11750  11751 -11752  192 -11754 0
 11750  11751 -11752  192 -11755 0

c  0-1 --> -1
c    (-b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧ -p_192) -> ( b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0)
c  in CNF:
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨  b^{12, 17}_2
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_1
c     b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨  b^{12, 17}_0
c  in DIMACS:
 11750  11751  11752  192  11753 0
 11750  11751  11752  192 -11754 0
 11750  11751  11752  192  11755 0

c  -1-1 --> -2
c    ( b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧  b^{12, 16}_0 ∧ -p_192) -> ( b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0)
c  in CNF:
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨  b^{12, 17}_2
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨  b^{12, 17}_1
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨  p_192 ∨ -b^{12, 17}_0
c  in DIMACS:
-11750  11751 -11752  192  11753 0
-11750  11751 -11752  192  11754 0
-11750  11751 -11752  192 -11755 0

c  -2-1 --> break 
c    ( b^{12, 16}_2 ∧  b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨  b^{12, 16}_0 ∨  p_192 ∨ break
c  in DIMACS:
-11750 -11751  11752  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 16}_2 ∧ -b^{12, 16}_1 ∧ -b^{12, 16}_0 ∧ true) 
c  in CNF:
c    -b^{12, 16}_2 ∨  b^{12, 16}_1 ∨  b^{12, 16}_0 ∨ false 
c  in DIMACS:
-11750  11751  11752  0

c  3 does not represent an automaton state.
c    -(-b^{12, 16}_2 ∧  b^{12, 16}_1 ∧  b^{12, 16}_0 ∧ true) 
c  in CNF:
c     b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ false 
c  in DIMACS:
 11750 -11751 -11752  0
c  -3 does not represent an automaton state.
c    -( b^{12, 16}_2 ∧  b^{12, 16}_1 ∧  b^{12, 16}_0 ∧ true) 
c  in CNF:
c    -b^{12, 16}_2 ∨ -b^{12, 16}_1 ∨ -b^{12, 16}_0 ∨ false 
c  in DIMACS:
-11750 -11751 -11752  0

c i = 17
c  -2+1 --> -1
c    ( b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧  p_204) -> ( b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0)
c  in CNF:
c    -b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨  b^{12, 18}_2
c    -b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_1
c    -b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨  b^{12, 18}_0
c  in DIMACS:
-11753 -11754  11755 -204  11756 0
-11753 -11754  11755 -204 -11757 0
-11753 -11754  11755 -204  11758 0

c  -1+1 --> 0
c    ( b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0 ∧  p_204) -> (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧ -b^{12, 18}_0)
c  in CNF:
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_2
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_1
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_0
c  in DIMACS:
-11753  11754 -11755 -204 -11756 0
-11753  11754 -11755 -204 -11757 0
-11753  11754 -11755 -204 -11758 0

c  0+1 --> 1
c    (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧  p_204) -> (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0)
c  in CNF:
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_2
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_1
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨  b^{12, 18}_0
c  in DIMACS:
 11753  11754  11755 -204 -11756 0
 11753  11754  11755 -204 -11757 0
 11753  11754  11755 -204  11758 0

c  1+1 --> 2
c    (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0 ∧  p_204) -> (-b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0)
c  in CNF:
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_2
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨  b^{12, 18}_1
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ -p_204 ∨ -b^{12, 18}_0
c  in DIMACS:
 11753  11754 -11755 -204 -11756 0
 11753  11754 -11755 -204  11757 0
 11753  11754 -11755 -204 -11758 0

c  2+1 --> break 
c    (-b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧  p_204) -> break
c  in CNF:
c     b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 11753 -11754  11755 -204 1162 0


c  2-1 --> 1
c    (-b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧ -p_204) -> (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0)
c  in CNF:
c     b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_2
c     b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_1
c     b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨  b^{12, 18}_0
c  in DIMACS:
 11753 -11754  11755  204 -11756 0
 11753 -11754  11755  204 -11757 0
 11753 -11754  11755  204  11758 0

c  1-1 --> 0
c    (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0 ∧ -p_204) -> (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧ -b^{12, 18}_0)
c  in CNF:
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_2
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_1
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_0
c  in DIMACS:
 11753  11754 -11755  204 -11756 0
 11753  11754 -11755  204 -11757 0
 11753  11754 -11755  204 -11758 0

c  0-1 --> -1
c    (-b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧ -p_204) -> ( b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0)
c  in CNF:
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨  b^{12, 18}_2
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_1
c     b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨  b^{12, 18}_0
c  in DIMACS:
 11753  11754  11755  204  11756 0
 11753  11754  11755  204 -11757 0
 11753  11754  11755  204  11758 0

c  -1-1 --> -2
c    ( b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧  b^{12, 17}_0 ∧ -p_204) -> ( b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0)
c  in CNF:
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨  b^{12, 18}_2
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨  b^{12, 18}_1
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨  p_204 ∨ -b^{12, 18}_0
c  in DIMACS:
-11753  11754 -11755  204  11756 0
-11753  11754 -11755  204  11757 0
-11753  11754 -11755  204 -11758 0

c  -2-1 --> break 
c    ( b^{12, 17}_2 ∧  b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨  b^{12, 17}_0 ∨  p_204 ∨ break
c  in DIMACS:
-11753 -11754  11755  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 17}_2 ∧ -b^{12, 17}_1 ∧ -b^{12, 17}_0 ∧ true) 
c  in CNF:
c    -b^{12, 17}_2 ∨  b^{12, 17}_1 ∨  b^{12, 17}_0 ∨ false 
c  in DIMACS:
-11753  11754  11755  0

c  3 does not represent an automaton state.
c    -(-b^{12, 17}_2 ∧  b^{12, 17}_1 ∧  b^{12, 17}_0 ∧ true) 
c  in CNF:
c     b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ false 
c  in DIMACS:
 11753 -11754 -11755  0
c  -3 does not represent an automaton state.
c    -( b^{12, 17}_2 ∧  b^{12, 17}_1 ∧  b^{12, 17}_0 ∧ true) 
c  in CNF:
c    -b^{12, 17}_2 ∨ -b^{12, 17}_1 ∨ -b^{12, 17}_0 ∨ false 
c  in DIMACS:
-11753 -11754 -11755  0

c i = 18
c  -2+1 --> -1
c    ( b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧  p_216) -> ( b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0)
c  in CNF:
c    -b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨  b^{12, 19}_2
c    -b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_1
c    -b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨  b^{12, 19}_0
c  in DIMACS:
-11756 -11757  11758 -216  11759 0
-11756 -11757  11758 -216 -11760 0
-11756 -11757  11758 -216  11761 0

c  -1+1 --> 0
c    ( b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0 ∧  p_216) -> (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧ -b^{12, 19}_0)
c  in CNF:
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_2
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_1
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_0
c  in DIMACS:
-11756  11757 -11758 -216 -11759 0
-11756  11757 -11758 -216 -11760 0
-11756  11757 -11758 -216 -11761 0

c  0+1 --> 1
c    (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧  p_216) -> (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0)
c  in CNF:
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_2
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_1
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨  b^{12, 19}_0
c  in DIMACS:
 11756  11757  11758 -216 -11759 0
 11756  11757  11758 -216 -11760 0
 11756  11757  11758 -216  11761 0

c  1+1 --> 2
c    (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0 ∧  p_216) -> (-b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0)
c  in CNF:
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_2
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨  b^{12, 19}_1
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ -p_216 ∨ -b^{12, 19}_0
c  in DIMACS:
 11756  11757 -11758 -216 -11759 0
 11756  11757 -11758 -216  11760 0
 11756  11757 -11758 -216 -11761 0

c  2+1 --> break 
c    (-b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧  p_216) -> break
c  in CNF:
c     b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 11756 -11757  11758 -216 1162 0


c  2-1 --> 1
c    (-b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧ -p_216) -> (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0)
c  in CNF:
c     b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_2
c     b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_1
c     b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨  b^{12, 19}_0
c  in DIMACS:
 11756 -11757  11758  216 -11759 0
 11756 -11757  11758  216 -11760 0
 11756 -11757  11758  216  11761 0

c  1-1 --> 0
c    (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0 ∧ -p_216) -> (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧ -b^{12, 19}_0)
c  in CNF:
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_2
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_1
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_0
c  in DIMACS:
 11756  11757 -11758  216 -11759 0
 11756  11757 -11758  216 -11760 0
 11756  11757 -11758  216 -11761 0

c  0-1 --> -1
c    (-b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧ -p_216) -> ( b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0)
c  in CNF:
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨  b^{12, 19}_2
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_1
c     b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨  b^{12, 19}_0
c  in DIMACS:
 11756  11757  11758  216  11759 0
 11756  11757  11758  216 -11760 0
 11756  11757  11758  216  11761 0

c  -1-1 --> -2
c    ( b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧  b^{12, 18}_0 ∧ -p_216) -> ( b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0)
c  in CNF:
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨  b^{12, 19}_2
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨  b^{12, 19}_1
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨  p_216 ∨ -b^{12, 19}_0
c  in DIMACS:
-11756  11757 -11758  216  11759 0
-11756  11757 -11758  216  11760 0
-11756  11757 -11758  216 -11761 0

c  -2-1 --> break 
c    ( b^{12, 18}_2 ∧  b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨  b^{12, 18}_0 ∨  p_216 ∨ break
c  in DIMACS:
-11756 -11757  11758  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 18}_2 ∧ -b^{12, 18}_1 ∧ -b^{12, 18}_0 ∧ true) 
c  in CNF:
c    -b^{12, 18}_2 ∨  b^{12, 18}_1 ∨  b^{12, 18}_0 ∨ false 
c  in DIMACS:
-11756  11757  11758  0

c  3 does not represent an automaton state.
c    -(-b^{12, 18}_2 ∧  b^{12, 18}_1 ∧  b^{12, 18}_0 ∧ true) 
c  in CNF:
c     b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ false 
c  in DIMACS:
 11756 -11757 -11758  0
c  -3 does not represent an automaton state.
c    -( b^{12, 18}_2 ∧  b^{12, 18}_1 ∧  b^{12, 18}_0 ∧ true) 
c  in CNF:
c    -b^{12, 18}_2 ∨ -b^{12, 18}_1 ∨ -b^{12, 18}_0 ∨ false 
c  in DIMACS:
-11756 -11757 -11758  0

c i = 19
c  -2+1 --> -1
c    ( b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧  p_228) -> ( b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0)
c  in CNF:
c    -b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨  b^{12, 20}_2
c    -b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_1
c    -b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨  b^{12, 20}_0
c  in DIMACS:
-11759 -11760  11761 -228  11762 0
-11759 -11760  11761 -228 -11763 0
-11759 -11760  11761 -228  11764 0

c  -1+1 --> 0
c    ( b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0 ∧  p_228) -> (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧ -b^{12, 20}_0)
c  in CNF:
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_2
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_1
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_0
c  in DIMACS:
-11759  11760 -11761 -228 -11762 0
-11759  11760 -11761 -228 -11763 0
-11759  11760 -11761 -228 -11764 0

c  0+1 --> 1
c    (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧  p_228) -> (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0)
c  in CNF:
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_2
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_1
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨  b^{12, 20}_0
c  in DIMACS:
 11759  11760  11761 -228 -11762 0
 11759  11760  11761 -228 -11763 0
 11759  11760  11761 -228  11764 0

c  1+1 --> 2
c    (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0 ∧  p_228) -> (-b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0)
c  in CNF:
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_2
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨  b^{12, 20}_1
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ -p_228 ∨ -b^{12, 20}_0
c  in DIMACS:
 11759  11760 -11761 -228 -11762 0
 11759  11760 -11761 -228  11763 0
 11759  11760 -11761 -228 -11764 0

c  2+1 --> break 
c    (-b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧  p_228) -> break
c  in CNF:
c     b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 11759 -11760  11761 -228 1162 0


c  2-1 --> 1
c    (-b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧ -p_228) -> (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0)
c  in CNF:
c     b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_2
c     b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_1
c     b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨  b^{12, 20}_0
c  in DIMACS:
 11759 -11760  11761  228 -11762 0
 11759 -11760  11761  228 -11763 0
 11759 -11760  11761  228  11764 0

c  1-1 --> 0
c    (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0 ∧ -p_228) -> (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧ -b^{12, 20}_0)
c  in CNF:
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_2
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_1
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_0
c  in DIMACS:
 11759  11760 -11761  228 -11762 0
 11759  11760 -11761  228 -11763 0
 11759  11760 -11761  228 -11764 0

c  0-1 --> -1
c    (-b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧ -p_228) -> ( b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0)
c  in CNF:
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨  b^{12, 20}_2
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_1
c     b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨  b^{12, 20}_0
c  in DIMACS:
 11759  11760  11761  228  11762 0
 11759  11760  11761  228 -11763 0
 11759  11760  11761  228  11764 0

c  -1-1 --> -2
c    ( b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧  b^{12, 19}_0 ∧ -p_228) -> ( b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0)
c  in CNF:
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨  b^{12, 20}_2
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨  b^{12, 20}_1
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨  p_228 ∨ -b^{12, 20}_0
c  in DIMACS:
-11759  11760 -11761  228  11762 0
-11759  11760 -11761  228  11763 0
-11759  11760 -11761  228 -11764 0

c  -2-1 --> break 
c    ( b^{12, 19}_2 ∧  b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨  b^{12, 19}_0 ∨  p_228 ∨ break
c  in DIMACS:
-11759 -11760  11761  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 19}_2 ∧ -b^{12, 19}_1 ∧ -b^{12, 19}_0 ∧ true) 
c  in CNF:
c    -b^{12, 19}_2 ∨  b^{12, 19}_1 ∨  b^{12, 19}_0 ∨ false 
c  in DIMACS:
-11759  11760  11761  0

c  3 does not represent an automaton state.
c    -(-b^{12, 19}_2 ∧  b^{12, 19}_1 ∧  b^{12, 19}_0 ∧ true) 
c  in CNF:
c     b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ false 
c  in DIMACS:
 11759 -11760 -11761  0
c  -3 does not represent an automaton state.
c    -( b^{12, 19}_2 ∧  b^{12, 19}_1 ∧  b^{12, 19}_0 ∧ true) 
c  in CNF:
c    -b^{12, 19}_2 ∨ -b^{12, 19}_1 ∨ -b^{12, 19}_0 ∨ false 
c  in DIMACS:
-11759 -11760 -11761  0

c i = 20
c  -2+1 --> -1
c    ( b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧  p_240) -> ( b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0)
c  in CNF:
c    -b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨  b^{12, 21}_2
c    -b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_1
c    -b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨  b^{12, 21}_0
c  in DIMACS:
-11762 -11763  11764 -240  11765 0
-11762 -11763  11764 -240 -11766 0
-11762 -11763  11764 -240  11767 0

c  -1+1 --> 0
c    ( b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0 ∧  p_240) -> (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧ -b^{12, 21}_0)
c  in CNF:
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_2
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_1
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_0
c  in DIMACS:
-11762  11763 -11764 -240 -11765 0
-11762  11763 -11764 -240 -11766 0
-11762  11763 -11764 -240 -11767 0

c  0+1 --> 1
c    (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧  p_240) -> (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0)
c  in CNF:
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_2
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_1
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨  b^{12, 21}_0
c  in DIMACS:
 11762  11763  11764 -240 -11765 0
 11762  11763  11764 -240 -11766 0
 11762  11763  11764 -240  11767 0

c  1+1 --> 2
c    (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0 ∧  p_240) -> (-b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0)
c  in CNF:
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_2
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨  b^{12, 21}_1
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ -p_240 ∨ -b^{12, 21}_0
c  in DIMACS:
 11762  11763 -11764 -240 -11765 0
 11762  11763 -11764 -240  11766 0
 11762  11763 -11764 -240 -11767 0

c  2+1 --> break 
c    (-b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧  p_240) -> break
c  in CNF:
c     b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 11762 -11763  11764 -240 1162 0


c  2-1 --> 1
c    (-b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧ -p_240) -> (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0)
c  in CNF:
c     b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_2
c     b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_1
c     b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨  b^{12, 21}_0
c  in DIMACS:
 11762 -11763  11764  240 -11765 0
 11762 -11763  11764  240 -11766 0
 11762 -11763  11764  240  11767 0

c  1-1 --> 0
c    (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0 ∧ -p_240) -> (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧ -b^{12, 21}_0)
c  in CNF:
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_2
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_1
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_0
c  in DIMACS:
 11762  11763 -11764  240 -11765 0
 11762  11763 -11764  240 -11766 0
 11762  11763 -11764  240 -11767 0

c  0-1 --> -1
c    (-b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧ -p_240) -> ( b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0)
c  in CNF:
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨  b^{12, 21}_2
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_1
c     b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨  b^{12, 21}_0
c  in DIMACS:
 11762  11763  11764  240  11765 0
 11762  11763  11764  240 -11766 0
 11762  11763  11764  240  11767 0

c  -1-1 --> -2
c    ( b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧  b^{12, 20}_0 ∧ -p_240) -> ( b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0)
c  in CNF:
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨  b^{12, 21}_2
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨  b^{12, 21}_1
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨  p_240 ∨ -b^{12, 21}_0
c  in DIMACS:
-11762  11763 -11764  240  11765 0
-11762  11763 -11764  240  11766 0
-11762  11763 -11764  240 -11767 0

c  -2-1 --> break 
c    ( b^{12, 20}_2 ∧  b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨  b^{12, 20}_0 ∨  p_240 ∨ break
c  in DIMACS:
-11762 -11763  11764  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 20}_2 ∧ -b^{12, 20}_1 ∧ -b^{12, 20}_0 ∧ true) 
c  in CNF:
c    -b^{12, 20}_2 ∨  b^{12, 20}_1 ∨  b^{12, 20}_0 ∨ false 
c  in DIMACS:
-11762  11763  11764  0

c  3 does not represent an automaton state.
c    -(-b^{12, 20}_2 ∧  b^{12, 20}_1 ∧  b^{12, 20}_0 ∧ true) 
c  in CNF:
c     b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ false 
c  in DIMACS:
 11762 -11763 -11764  0
c  -3 does not represent an automaton state.
c    -( b^{12, 20}_2 ∧  b^{12, 20}_1 ∧  b^{12, 20}_0 ∧ true) 
c  in CNF:
c    -b^{12, 20}_2 ∨ -b^{12, 20}_1 ∨ -b^{12, 20}_0 ∨ false 
c  in DIMACS:
-11762 -11763 -11764  0

c i = 21
c  -2+1 --> -1
c    ( b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧  p_252) -> ( b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0)
c  in CNF:
c    -b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨  b^{12, 22}_2
c    -b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_1
c    -b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨  b^{12, 22}_0
c  in DIMACS:
-11765 -11766  11767 -252  11768 0
-11765 -11766  11767 -252 -11769 0
-11765 -11766  11767 -252  11770 0

c  -1+1 --> 0
c    ( b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0 ∧  p_252) -> (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧ -b^{12, 22}_0)
c  in CNF:
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_2
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_1
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_0
c  in DIMACS:
-11765  11766 -11767 -252 -11768 0
-11765  11766 -11767 -252 -11769 0
-11765  11766 -11767 -252 -11770 0

c  0+1 --> 1
c    (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧  p_252) -> (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0)
c  in CNF:
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_2
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_1
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨  b^{12, 22}_0
c  in DIMACS:
 11765  11766  11767 -252 -11768 0
 11765  11766  11767 -252 -11769 0
 11765  11766  11767 -252  11770 0

c  1+1 --> 2
c    (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0 ∧  p_252) -> (-b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0)
c  in CNF:
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_2
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨  b^{12, 22}_1
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ -p_252 ∨ -b^{12, 22}_0
c  in DIMACS:
 11765  11766 -11767 -252 -11768 0
 11765  11766 -11767 -252  11769 0
 11765  11766 -11767 -252 -11770 0

c  2+1 --> break 
c    (-b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧  p_252) -> break
c  in CNF:
c     b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 11765 -11766  11767 -252 1162 0


c  2-1 --> 1
c    (-b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧ -p_252) -> (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0)
c  in CNF:
c     b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_2
c     b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_1
c     b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨  b^{12, 22}_0
c  in DIMACS:
 11765 -11766  11767  252 -11768 0
 11765 -11766  11767  252 -11769 0
 11765 -11766  11767  252  11770 0

c  1-1 --> 0
c    (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0 ∧ -p_252) -> (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧ -b^{12, 22}_0)
c  in CNF:
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_2
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_1
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_0
c  in DIMACS:
 11765  11766 -11767  252 -11768 0
 11765  11766 -11767  252 -11769 0
 11765  11766 -11767  252 -11770 0

c  0-1 --> -1
c    (-b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧ -p_252) -> ( b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0)
c  in CNF:
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨  b^{12, 22}_2
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_1
c     b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨  b^{12, 22}_0
c  in DIMACS:
 11765  11766  11767  252  11768 0
 11765  11766  11767  252 -11769 0
 11765  11766  11767  252  11770 0

c  -1-1 --> -2
c    ( b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧  b^{12, 21}_0 ∧ -p_252) -> ( b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0)
c  in CNF:
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨  b^{12, 22}_2
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨  b^{12, 22}_1
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨  p_252 ∨ -b^{12, 22}_0
c  in DIMACS:
-11765  11766 -11767  252  11768 0
-11765  11766 -11767  252  11769 0
-11765  11766 -11767  252 -11770 0

c  -2-1 --> break 
c    ( b^{12, 21}_2 ∧  b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨  b^{12, 21}_0 ∨  p_252 ∨ break
c  in DIMACS:
-11765 -11766  11767  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 21}_2 ∧ -b^{12, 21}_1 ∧ -b^{12, 21}_0 ∧ true) 
c  in CNF:
c    -b^{12, 21}_2 ∨  b^{12, 21}_1 ∨  b^{12, 21}_0 ∨ false 
c  in DIMACS:
-11765  11766  11767  0

c  3 does not represent an automaton state.
c    -(-b^{12, 21}_2 ∧  b^{12, 21}_1 ∧  b^{12, 21}_0 ∧ true) 
c  in CNF:
c     b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ false 
c  in DIMACS:
 11765 -11766 -11767  0
c  -3 does not represent an automaton state.
c    -( b^{12, 21}_2 ∧  b^{12, 21}_1 ∧  b^{12, 21}_0 ∧ true) 
c  in CNF:
c    -b^{12, 21}_2 ∨ -b^{12, 21}_1 ∨ -b^{12, 21}_0 ∨ false 
c  in DIMACS:
-11765 -11766 -11767  0

c i = 22
c  -2+1 --> -1
c    ( b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧  p_264) -> ( b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0)
c  in CNF:
c    -b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨  b^{12, 23}_2
c    -b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_1
c    -b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨  b^{12, 23}_0
c  in DIMACS:
-11768 -11769  11770 -264  11771 0
-11768 -11769  11770 -264 -11772 0
-11768 -11769  11770 -264  11773 0

c  -1+1 --> 0
c    ( b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0 ∧  p_264) -> (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧ -b^{12, 23}_0)
c  in CNF:
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_2
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_1
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_0
c  in DIMACS:
-11768  11769 -11770 -264 -11771 0
-11768  11769 -11770 -264 -11772 0
-11768  11769 -11770 -264 -11773 0

c  0+1 --> 1
c    (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧  p_264) -> (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0)
c  in CNF:
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_2
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_1
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨  b^{12, 23}_0
c  in DIMACS:
 11768  11769  11770 -264 -11771 0
 11768  11769  11770 -264 -11772 0
 11768  11769  11770 -264  11773 0

c  1+1 --> 2
c    (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0 ∧  p_264) -> (-b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0)
c  in CNF:
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_2
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨  b^{12, 23}_1
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ -p_264 ∨ -b^{12, 23}_0
c  in DIMACS:
 11768  11769 -11770 -264 -11771 0
 11768  11769 -11770 -264  11772 0
 11768  11769 -11770 -264 -11773 0

c  2+1 --> break 
c    (-b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧  p_264) -> break
c  in CNF:
c     b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 11768 -11769  11770 -264 1162 0


c  2-1 --> 1
c    (-b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧ -p_264) -> (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0)
c  in CNF:
c     b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_2
c     b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_1
c     b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨  b^{12, 23}_0
c  in DIMACS:
 11768 -11769  11770  264 -11771 0
 11768 -11769  11770  264 -11772 0
 11768 -11769  11770  264  11773 0

c  1-1 --> 0
c    (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0 ∧ -p_264) -> (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧ -b^{12, 23}_0)
c  in CNF:
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_2
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_1
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_0
c  in DIMACS:
 11768  11769 -11770  264 -11771 0
 11768  11769 -11770  264 -11772 0
 11768  11769 -11770  264 -11773 0

c  0-1 --> -1
c    (-b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧ -p_264) -> ( b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0)
c  in CNF:
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨  b^{12, 23}_2
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_1
c     b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨  b^{12, 23}_0
c  in DIMACS:
 11768  11769  11770  264  11771 0
 11768  11769  11770  264 -11772 0
 11768  11769  11770  264  11773 0

c  -1-1 --> -2
c    ( b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧  b^{12, 22}_0 ∧ -p_264) -> ( b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0)
c  in CNF:
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨  b^{12, 23}_2
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨  b^{12, 23}_1
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨  p_264 ∨ -b^{12, 23}_0
c  in DIMACS:
-11768  11769 -11770  264  11771 0
-11768  11769 -11770  264  11772 0
-11768  11769 -11770  264 -11773 0

c  -2-1 --> break 
c    ( b^{12, 22}_2 ∧  b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨  b^{12, 22}_0 ∨  p_264 ∨ break
c  in DIMACS:
-11768 -11769  11770  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 22}_2 ∧ -b^{12, 22}_1 ∧ -b^{12, 22}_0 ∧ true) 
c  in CNF:
c    -b^{12, 22}_2 ∨  b^{12, 22}_1 ∨  b^{12, 22}_0 ∨ false 
c  in DIMACS:
-11768  11769  11770  0

c  3 does not represent an automaton state.
c    -(-b^{12, 22}_2 ∧  b^{12, 22}_1 ∧  b^{12, 22}_0 ∧ true) 
c  in CNF:
c     b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ false 
c  in DIMACS:
 11768 -11769 -11770  0
c  -3 does not represent an automaton state.
c    -( b^{12, 22}_2 ∧  b^{12, 22}_1 ∧  b^{12, 22}_0 ∧ true) 
c  in CNF:
c    -b^{12, 22}_2 ∨ -b^{12, 22}_1 ∨ -b^{12, 22}_0 ∨ false 
c  in DIMACS:
-11768 -11769 -11770  0

c i = 23
c  -2+1 --> -1
c    ( b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧  p_276) -> ( b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0)
c  in CNF:
c    -b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨  b^{12, 24}_2
c    -b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_1
c    -b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨  b^{12, 24}_0
c  in DIMACS:
-11771 -11772  11773 -276  11774 0
-11771 -11772  11773 -276 -11775 0
-11771 -11772  11773 -276  11776 0

c  -1+1 --> 0
c    ( b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0 ∧  p_276) -> (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧ -b^{12, 24}_0)
c  in CNF:
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_2
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_1
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_0
c  in DIMACS:
-11771  11772 -11773 -276 -11774 0
-11771  11772 -11773 -276 -11775 0
-11771  11772 -11773 -276 -11776 0

c  0+1 --> 1
c    (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧  p_276) -> (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0)
c  in CNF:
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_2
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_1
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨  b^{12, 24}_0
c  in DIMACS:
 11771  11772  11773 -276 -11774 0
 11771  11772  11773 -276 -11775 0
 11771  11772  11773 -276  11776 0

c  1+1 --> 2
c    (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0 ∧  p_276) -> (-b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0)
c  in CNF:
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_2
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨  b^{12, 24}_1
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ -p_276 ∨ -b^{12, 24}_0
c  in DIMACS:
 11771  11772 -11773 -276 -11774 0
 11771  11772 -11773 -276  11775 0
 11771  11772 -11773 -276 -11776 0

c  2+1 --> break 
c    (-b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧  p_276) -> break
c  in CNF:
c     b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 11771 -11772  11773 -276 1162 0


c  2-1 --> 1
c    (-b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧ -p_276) -> (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0)
c  in CNF:
c     b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_2
c     b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_1
c     b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨  b^{12, 24}_0
c  in DIMACS:
 11771 -11772  11773  276 -11774 0
 11771 -11772  11773  276 -11775 0
 11771 -11772  11773  276  11776 0

c  1-1 --> 0
c    (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0 ∧ -p_276) -> (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧ -b^{12, 24}_0)
c  in CNF:
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_2
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_1
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_0
c  in DIMACS:
 11771  11772 -11773  276 -11774 0
 11771  11772 -11773  276 -11775 0
 11771  11772 -11773  276 -11776 0

c  0-1 --> -1
c    (-b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧ -p_276) -> ( b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0)
c  in CNF:
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨  b^{12, 24}_2
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_1
c     b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨  b^{12, 24}_0
c  in DIMACS:
 11771  11772  11773  276  11774 0
 11771  11772  11773  276 -11775 0
 11771  11772  11773  276  11776 0

c  -1-1 --> -2
c    ( b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧  b^{12, 23}_0 ∧ -p_276) -> ( b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0)
c  in CNF:
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨  b^{12, 24}_2
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨  b^{12, 24}_1
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨  p_276 ∨ -b^{12, 24}_0
c  in DIMACS:
-11771  11772 -11773  276  11774 0
-11771  11772 -11773  276  11775 0
-11771  11772 -11773  276 -11776 0

c  -2-1 --> break 
c    ( b^{12, 23}_2 ∧  b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨  b^{12, 23}_0 ∨  p_276 ∨ break
c  in DIMACS:
-11771 -11772  11773  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 23}_2 ∧ -b^{12, 23}_1 ∧ -b^{12, 23}_0 ∧ true) 
c  in CNF:
c    -b^{12, 23}_2 ∨  b^{12, 23}_1 ∨  b^{12, 23}_0 ∨ false 
c  in DIMACS:
-11771  11772  11773  0

c  3 does not represent an automaton state.
c    -(-b^{12, 23}_2 ∧  b^{12, 23}_1 ∧  b^{12, 23}_0 ∧ true) 
c  in CNF:
c     b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ false 
c  in DIMACS:
 11771 -11772 -11773  0
c  -3 does not represent an automaton state.
c    -( b^{12, 23}_2 ∧  b^{12, 23}_1 ∧  b^{12, 23}_0 ∧ true) 
c  in CNF:
c    -b^{12, 23}_2 ∨ -b^{12, 23}_1 ∨ -b^{12, 23}_0 ∨ false 
c  in DIMACS:
-11771 -11772 -11773  0

c i = 24
c  -2+1 --> -1
c    ( b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧  p_288) -> ( b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0)
c  in CNF:
c    -b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨  b^{12, 25}_2
c    -b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_1
c    -b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨  b^{12, 25}_0
c  in DIMACS:
-11774 -11775  11776 -288  11777 0
-11774 -11775  11776 -288 -11778 0
-11774 -11775  11776 -288  11779 0

c  -1+1 --> 0
c    ( b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0 ∧  p_288) -> (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧ -b^{12, 25}_0)
c  in CNF:
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_2
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_1
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_0
c  in DIMACS:
-11774  11775 -11776 -288 -11777 0
-11774  11775 -11776 -288 -11778 0
-11774  11775 -11776 -288 -11779 0

c  0+1 --> 1
c    (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧  p_288) -> (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0)
c  in CNF:
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_2
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_1
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨  b^{12, 25}_0
c  in DIMACS:
 11774  11775  11776 -288 -11777 0
 11774  11775  11776 -288 -11778 0
 11774  11775  11776 -288  11779 0

c  1+1 --> 2
c    (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0 ∧  p_288) -> (-b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0)
c  in CNF:
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_2
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨  b^{12, 25}_1
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ -p_288 ∨ -b^{12, 25}_0
c  in DIMACS:
 11774  11775 -11776 -288 -11777 0
 11774  11775 -11776 -288  11778 0
 11774  11775 -11776 -288 -11779 0

c  2+1 --> break 
c    (-b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧  p_288) -> break
c  in CNF:
c     b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 11774 -11775  11776 -288 1162 0


c  2-1 --> 1
c    (-b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧ -p_288) -> (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0)
c  in CNF:
c     b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_2
c     b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_1
c     b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨  b^{12, 25}_0
c  in DIMACS:
 11774 -11775  11776  288 -11777 0
 11774 -11775  11776  288 -11778 0
 11774 -11775  11776  288  11779 0

c  1-1 --> 0
c    (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0 ∧ -p_288) -> (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧ -b^{12, 25}_0)
c  in CNF:
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_2
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_1
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_0
c  in DIMACS:
 11774  11775 -11776  288 -11777 0
 11774  11775 -11776  288 -11778 0
 11774  11775 -11776  288 -11779 0

c  0-1 --> -1
c    (-b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧ -p_288) -> ( b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0)
c  in CNF:
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨  b^{12, 25}_2
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_1
c     b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨  b^{12, 25}_0
c  in DIMACS:
 11774  11775  11776  288  11777 0
 11774  11775  11776  288 -11778 0
 11774  11775  11776  288  11779 0

c  -1-1 --> -2
c    ( b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧  b^{12, 24}_0 ∧ -p_288) -> ( b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0)
c  in CNF:
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨  b^{12, 25}_2
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨  b^{12, 25}_1
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨  p_288 ∨ -b^{12, 25}_0
c  in DIMACS:
-11774  11775 -11776  288  11777 0
-11774  11775 -11776  288  11778 0
-11774  11775 -11776  288 -11779 0

c  -2-1 --> break 
c    ( b^{12, 24}_2 ∧  b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨  b^{12, 24}_0 ∨  p_288 ∨ break
c  in DIMACS:
-11774 -11775  11776  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 24}_2 ∧ -b^{12, 24}_1 ∧ -b^{12, 24}_0 ∧ true) 
c  in CNF:
c    -b^{12, 24}_2 ∨  b^{12, 24}_1 ∨  b^{12, 24}_0 ∨ false 
c  in DIMACS:
-11774  11775  11776  0

c  3 does not represent an automaton state.
c    -(-b^{12, 24}_2 ∧  b^{12, 24}_1 ∧  b^{12, 24}_0 ∧ true) 
c  in CNF:
c     b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ false 
c  in DIMACS:
 11774 -11775 -11776  0
c  -3 does not represent an automaton state.
c    -( b^{12, 24}_2 ∧  b^{12, 24}_1 ∧  b^{12, 24}_0 ∧ true) 
c  in CNF:
c    -b^{12, 24}_2 ∨ -b^{12, 24}_1 ∨ -b^{12, 24}_0 ∨ false 
c  in DIMACS:
-11774 -11775 -11776  0

c i = 25
c  -2+1 --> -1
c    ( b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧  p_300) -> ( b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0)
c  in CNF:
c    -b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨  b^{12, 26}_2
c    -b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_1
c    -b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨  b^{12, 26}_0
c  in DIMACS:
-11777 -11778  11779 -300  11780 0
-11777 -11778  11779 -300 -11781 0
-11777 -11778  11779 -300  11782 0

c  -1+1 --> 0
c    ( b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0 ∧  p_300) -> (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧ -b^{12, 26}_0)
c  in CNF:
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_2
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_1
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_0
c  in DIMACS:
-11777  11778 -11779 -300 -11780 0
-11777  11778 -11779 -300 -11781 0
-11777  11778 -11779 -300 -11782 0

c  0+1 --> 1
c    (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧  p_300) -> (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0)
c  in CNF:
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_2
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_1
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨  b^{12, 26}_0
c  in DIMACS:
 11777  11778  11779 -300 -11780 0
 11777  11778  11779 -300 -11781 0
 11777  11778  11779 -300  11782 0

c  1+1 --> 2
c    (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0 ∧  p_300) -> (-b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0)
c  in CNF:
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_2
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨  b^{12, 26}_1
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ -p_300 ∨ -b^{12, 26}_0
c  in DIMACS:
 11777  11778 -11779 -300 -11780 0
 11777  11778 -11779 -300  11781 0
 11777  11778 -11779 -300 -11782 0

c  2+1 --> break 
c    (-b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧  p_300) -> break
c  in CNF:
c     b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 11777 -11778  11779 -300 1162 0


c  2-1 --> 1
c    (-b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧ -p_300) -> (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0)
c  in CNF:
c     b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_2
c     b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_1
c     b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨  b^{12, 26}_0
c  in DIMACS:
 11777 -11778  11779  300 -11780 0
 11777 -11778  11779  300 -11781 0
 11777 -11778  11779  300  11782 0

c  1-1 --> 0
c    (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0 ∧ -p_300) -> (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧ -b^{12, 26}_0)
c  in CNF:
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_2
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_1
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_0
c  in DIMACS:
 11777  11778 -11779  300 -11780 0
 11777  11778 -11779  300 -11781 0
 11777  11778 -11779  300 -11782 0

c  0-1 --> -1
c    (-b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧ -p_300) -> ( b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0)
c  in CNF:
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨  b^{12, 26}_2
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_1
c     b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨  b^{12, 26}_0
c  in DIMACS:
 11777  11778  11779  300  11780 0
 11777  11778  11779  300 -11781 0
 11777  11778  11779  300  11782 0

c  -1-1 --> -2
c    ( b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧  b^{12, 25}_0 ∧ -p_300) -> ( b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0)
c  in CNF:
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨  b^{12, 26}_2
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨  b^{12, 26}_1
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨  p_300 ∨ -b^{12, 26}_0
c  in DIMACS:
-11777  11778 -11779  300  11780 0
-11777  11778 -11779  300  11781 0
-11777  11778 -11779  300 -11782 0

c  -2-1 --> break 
c    ( b^{12, 25}_2 ∧  b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨  b^{12, 25}_0 ∨  p_300 ∨ break
c  in DIMACS:
-11777 -11778  11779  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 25}_2 ∧ -b^{12, 25}_1 ∧ -b^{12, 25}_0 ∧ true) 
c  in CNF:
c    -b^{12, 25}_2 ∨  b^{12, 25}_1 ∨  b^{12, 25}_0 ∨ false 
c  in DIMACS:
-11777  11778  11779  0

c  3 does not represent an automaton state.
c    -(-b^{12, 25}_2 ∧  b^{12, 25}_1 ∧  b^{12, 25}_0 ∧ true) 
c  in CNF:
c     b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ false 
c  in DIMACS:
 11777 -11778 -11779  0
c  -3 does not represent an automaton state.
c    -( b^{12, 25}_2 ∧  b^{12, 25}_1 ∧  b^{12, 25}_0 ∧ true) 
c  in CNF:
c    -b^{12, 25}_2 ∨ -b^{12, 25}_1 ∨ -b^{12, 25}_0 ∨ false 
c  in DIMACS:
-11777 -11778 -11779  0

c i = 26
c  -2+1 --> -1
c    ( b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧  p_312) -> ( b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0)
c  in CNF:
c    -b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨  b^{12, 27}_2
c    -b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_1
c    -b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨  b^{12, 27}_0
c  in DIMACS:
-11780 -11781  11782 -312  11783 0
-11780 -11781  11782 -312 -11784 0
-11780 -11781  11782 -312  11785 0

c  -1+1 --> 0
c    ( b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0 ∧  p_312) -> (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧ -b^{12, 27}_0)
c  in CNF:
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_2
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_1
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_0
c  in DIMACS:
-11780  11781 -11782 -312 -11783 0
-11780  11781 -11782 -312 -11784 0
-11780  11781 -11782 -312 -11785 0

c  0+1 --> 1
c    (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧  p_312) -> (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0)
c  in CNF:
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_2
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_1
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨  b^{12, 27}_0
c  in DIMACS:
 11780  11781  11782 -312 -11783 0
 11780  11781  11782 -312 -11784 0
 11780  11781  11782 -312  11785 0

c  1+1 --> 2
c    (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0 ∧  p_312) -> (-b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0)
c  in CNF:
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_2
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨  b^{12, 27}_1
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ -p_312 ∨ -b^{12, 27}_0
c  in DIMACS:
 11780  11781 -11782 -312 -11783 0
 11780  11781 -11782 -312  11784 0
 11780  11781 -11782 -312 -11785 0

c  2+1 --> break 
c    (-b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧  p_312) -> break
c  in CNF:
c     b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 11780 -11781  11782 -312 1162 0


c  2-1 --> 1
c    (-b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧ -p_312) -> (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0)
c  in CNF:
c     b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_2
c     b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_1
c     b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨  b^{12, 27}_0
c  in DIMACS:
 11780 -11781  11782  312 -11783 0
 11780 -11781  11782  312 -11784 0
 11780 -11781  11782  312  11785 0

c  1-1 --> 0
c    (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0 ∧ -p_312) -> (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧ -b^{12, 27}_0)
c  in CNF:
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_2
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_1
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_0
c  in DIMACS:
 11780  11781 -11782  312 -11783 0
 11780  11781 -11782  312 -11784 0
 11780  11781 -11782  312 -11785 0

c  0-1 --> -1
c    (-b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧ -p_312) -> ( b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0)
c  in CNF:
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨  b^{12, 27}_2
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_1
c     b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨  b^{12, 27}_0
c  in DIMACS:
 11780  11781  11782  312  11783 0
 11780  11781  11782  312 -11784 0
 11780  11781  11782  312  11785 0

c  -1-1 --> -2
c    ( b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧  b^{12, 26}_0 ∧ -p_312) -> ( b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0)
c  in CNF:
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨  b^{12, 27}_2
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨  b^{12, 27}_1
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨  p_312 ∨ -b^{12, 27}_0
c  in DIMACS:
-11780  11781 -11782  312  11783 0
-11780  11781 -11782  312  11784 0
-11780  11781 -11782  312 -11785 0

c  -2-1 --> break 
c    ( b^{12, 26}_2 ∧  b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨  b^{12, 26}_0 ∨  p_312 ∨ break
c  in DIMACS:
-11780 -11781  11782  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 26}_2 ∧ -b^{12, 26}_1 ∧ -b^{12, 26}_0 ∧ true) 
c  in CNF:
c    -b^{12, 26}_2 ∨  b^{12, 26}_1 ∨  b^{12, 26}_0 ∨ false 
c  in DIMACS:
-11780  11781  11782  0

c  3 does not represent an automaton state.
c    -(-b^{12, 26}_2 ∧  b^{12, 26}_1 ∧  b^{12, 26}_0 ∧ true) 
c  in CNF:
c     b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ false 
c  in DIMACS:
 11780 -11781 -11782  0
c  -3 does not represent an automaton state.
c    -( b^{12, 26}_2 ∧  b^{12, 26}_1 ∧  b^{12, 26}_0 ∧ true) 
c  in CNF:
c    -b^{12, 26}_2 ∨ -b^{12, 26}_1 ∨ -b^{12, 26}_0 ∨ false 
c  in DIMACS:
-11780 -11781 -11782  0

c i = 27
c  -2+1 --> -1
c    ( b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧  p_324) -> ( b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0)
c  in CNF:
c    -b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨  b^{12, 28}_2
c    -b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_1
c    -b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨  b^{12, 28}_0
c  in DIMACS:
-11783 -11784  11785 -324  11786 0
-11783 -11784  11785 -324 -11787 0
-11783 -11784  11785 -324  11788 0

c  -1+1 --> 0
c    ( b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0 ∧  p_324) -> (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧ -b^{12, 28}_0)
c  in CNF:
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_2
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_1
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_0
c  in DIMACS:
-11783  11784 -11785 -324 -11786 0
-11783  11784 -11785 -324 -11787 0
-11783  11784 -11785 -324 -11788 0

c  0+1 --> 1
c    (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧  p_324) -> (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0)
c  in CNF:
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_2
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_1
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨  b^{12, 28}_0
c  in DIMACS:
 11783  11784  11785 -324 -11786 0
 11783  11784  11785 -324 -11787 0
 11783  11784  11785 -324  11788 0

c  1+1 --> 2
c    (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0 ∧  p_324) -> (-b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0)
c  in CNF:
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_2
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨  b^{12, 28}_1
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ -p_324 ∨ -b^{12, 28}_0
c  in DIMACS:
 11783  11784 -11785 -324 -11786 0
 11783  11784 -11785 -324  11787 0
 11783  11784 -11785 -324 -11788 0

c  2+1 --> break 
c    (-b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧  p_324) -> break
c  in CNF:
c     b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 11783 -11784  11785 -324 1162 0


c  2-1 --> 1
c    (-b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧ -p_324) -> (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0)
c  in CNF:
c     b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_2
c     b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_1
c     b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨  b^{12, 28}_0
c  in DIMACS:
 11783 -11784  11785  324 -11786 0
 11783 -11784  11785  324 -11787 0
 11783 -11784  11785  324  11788 0

c  1-1 --> 0
c    (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0 ∧ -p_324) -> (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧ -b^{12, 28}_0)
c  in CNF:
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_2
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_1
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_0
c  in DIMACS:
 11783  11784 -11785  324 -11786 0
 11783  11784 -11785  324 -11787 0
 11783  11784 -11785  324 -11788 0

c  0-1 --> -1
c    (-b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧ -p_324) -> ( b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0)
c  in CNF:
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨  b^{12, 28}_2
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_1
c     b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨  b^{12, 28}_0
c  in DIMACS:
 11783  11784  11785  324  11786 0
 11783  11784  11785  324 -11787 0
 11783  11784  11785  324  11788 0

c  -1-1 --> -2
c    ( b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧  b^{12, 27}_0 ∧ -p_324) -> ( b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0)
c  in CNF:
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨  b^{12, 28}_2
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨  b^{12, 28}_1
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨  p_324 ∨ -b^{12, 28}_0
c  in DIMACS:
-11783  11784 -11785  324  11786 0
-11783  11784 -11785  324  11787 0
-11783  11784 -11785  324 -11788 0

c  -2-1 --> break 
c    ( b^{12, 27}_2 ∧  b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨  b^{12, 27}_0 ∨  p_324 ∨ break
c  in DIMACS:
-11783 -11784  11785  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 27}_2 ∧ -b^{12, 27}_1 ∧ -b^{12, 27}_0 ∧ true) 
c  in CNF:
c    -b^{12, 27}_2 ∨  b^{12, 27}_1 ∨  b^{12, 27}_0 ∨ false 
c  in DIMACS:
-11783  11784  11785  0

c  3 does not represent an automaton state.
c    -(-b^{12, 27}_2 ∧  b^{12, 27}_1 ∧  b^{12, 27}_0 ∧ true) 
c  in CNF:
c     b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ false 
c  in DIMACS:
 11783 -11784 -11785  0
c  -3 does not represent an automaton state.
c    -( b^{12, 27}_2 ∧  b^{12, 27}_1 ∧  b^{12, 27}_0 ∧ true) 
c  in CNF:
c    -b^{12, 27}_2 ∨ -b^{12, 27}_1 ∨ -b^{12, 27}_0 ∨ false 
c  in DIMACS:
-11783 -11784 -11785  0

c i = 28
c  -2+1 --> -1
c    ( b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧  p_336) -> ( b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0)
c  in CNF:
c    -b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨  b^{12, 29}_2
c    -b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_1
c    -b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨  b^{12, 29}_0
c  in DIMACS:
-11786 -11787  11788 -336  11789 0
-11786 -11787  11788 -336 -11790 0
-11786 -11787  11788 -336  11791 0

c  -1+1 --> 0
c    ( b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0 ∧  p_336) -> (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧ -b^{12, 29}_0)
c  in CNF:
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_2
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_1
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_0
c  in DIMACS:
-11786  11787 -11788 -336 -11789 0
-11786  11787 -11788 -336 -11790 0
-11786  11787 -11788 -336 -11791 0

c  0+1 --> 1
c    (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧  p_336) -> (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0)
c  in CNF:
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_2
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_1
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨  b^{12, 29}_0
c  in DIMACS:
 11786  11787  11788 -336 -11789 0
 11786  11787  11788 -336 -11790 0
 11786  11787  11788 -336  11791 0

c  1+1 --> 2
c    (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0 ∧  p_336) -> (-b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0)
c  in CNF:
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_2
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨  b^{12, 29}_1
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ -p_336 ∨ -b^{12, 29}_0
c  in DIMACS:
 11786  11787 -11788 -336 -11789 0
 11786  11787 -11788 -336  11790 0
 11786  11787 -11788 -336 -11791 0

c  2+1 --> break 
c    (-b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧  p_336) -> break
c  in CNF:
c     b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 11786 -11787  11788 -336 1162 0


c  2-1 --> 1
c    (-b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧ -p_336) -> (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0)
c  in CNF:
c     b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_2
c     b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_1
c     b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨  b^{12, 29}_0
c  in DIMACS:
 11786 -11787  11788  336 -11789 0
 11786 -11787  11788  336 -11790 0
 11786 -11787  11788  336  11791 0

c  1-1 --> 0
c    (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0 ∧ -p_336) -> (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧ -b^{12, 29}_0)
c  in CNF:
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_2
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_1
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_0
c  in DIMACS:
 11786  11787 -11788  336 -11789 0
 11786  11787 -11788  336 -11790 0
 11786  11787 -11788  336 -11791 0

c  0-1 --> -1
c    (-b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧ -p_336) -> ( b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0)
c  in CNF:
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨  b^{12, 29}_2
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_1
c     b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨  b^{12, 29}_0
c  in DIMACS:
 11786  11787  11788  336  11789 0
 11786  11787  11788  336 -11790 0
 11786  11787  11788  336  11791 0

c  -1-1 --> -2
c    ( b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧  b^{12, 28}_0 ∧ -p_336) -> ( b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0)
c  in CNF:
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨  b^{12, 29}_2
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨  b^{12, 29}_1
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨  p_336 ∨ -b^{12, 29}_0
c  in DIMACS:
-11786  11787 -11788  336  11789 0
-11786  11787 -11788  336  11790 0
-11786  11787 -11788  336 -11791 0

c  -2-1 --> break 
c    ( b^{12, 28}_2 ∧  b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨  b^{12, 28}_0 ∨  p_336 ∨ break
c  in DIMACS:
-11786 -11787  11788  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 28}_2 ∧ -b^{12, 28}_1 ∧ -b^{12, 28}_0 ∧ true) 
c  in CNF:
c    -b^{12, 28}_2 ∨  b^{12, 28}_1 ∨  b^{12, 28}_0 ∨ false 
c  in DIMACS:
-11786  11787  11788  0

c  3 does not represent an automaton state.
c    -(-b^{12, 28}_2 ∧  b^{12, 28}_1 ∧  b^{12, 28}_0 ∧ true) 
c  in CNF:
c     b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ false 
c  in DIMACS:
 11786 -11787 -11788  0
c  -3 does not represent an automaton state.
c    -( b^{12, 28}_2 ∧  b^{12, 28}_1 ∧  b^{12, 28}_0 ∧ true) 
c  in CNF:
c    -b^{12, 28}_2 ∨ -b^{12, 28}_1 ∨ -b^{12, 28}_0 ∨ false 
c  in DIMACS:
-11786 -11787 -11788  0

c i = 29
c  -2+1 --> -1
c    ( b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧  p_348) -> ( b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0)
c  in CNF:
c    -b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨  b^{12, 30}_2
c    -b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_1
c    -b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨  b^{12, 30}_0
c  in DIMACS:
-11789 -11790  11791 -348  11792 0
-11789 -11790  11791 -348 -11793 0
-11789 -11790  11791 -348  11794 0

c  -1+1 --> 0
c    ( b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0 ∧  p_348) -> (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧ -b^{12, 30}_0)
c  in CNF:
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_2
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_1
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_0
c  in DIMACS:
-11789  11790 -11791 -348 -11792 0
-11789  11790 -11791 -348 -11793 0
-11789  11790 -11791 -348 -11794 0

c  0+1 --> 1
c    (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧  p_348) -> (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0)
c  in CNF:
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_2
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_1
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨  b^{12, 30}_0
c  in DIMACS:
 11789  11790  11791 -348 -11792 0
 11789  11790  11791 -348 -11793 0
 11789  11790  11791 -348  11794 0

c  1+1 --> 2
c    (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0 ∧  p_348) -> (-b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0)
c  in CNF:
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_2
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨  b^{12, 30}_1
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ -p_348 ∨ -b^{12, 30}_0
c  in DIMACS:
 11789  11790 -11791 -348 -11792 0
 11789  11790 -11791 -348  11793 0
 11789  11790 -11791 -348 -11794 0

c  2+1 --> break 
c    (-b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧  p_348) -> break
c  in CNF:
c     b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 11789 -11790  11791 -348 1162 0


c  2-1 --> 1
c    (-b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧ -p_348) -> (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0)
c  in CNF:
c     b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_2
c     b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_1
c     b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨  b^{12, 30}_0
c  in DIMACS:
 11789 -11790  11791  348 -11792 0
 11789 -11790  11791  348 -11793 0
 11789 -11790  11791  348  11794 0

c  1-1 --> 0
c    (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0 ∧ -p_348) -> (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧ -b^{12, 30}_0)
c  in CNF:
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_2
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_1
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_0
c  in DIMACS:
 11789  11790 -11791  348 -11792 0
 11789  11790 -11791  348 -11793 0
 11789  11790 -11791  348 -11794 0

c  0-1 --> -1
c    (-b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧ -p_348) -> ( b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0)
c  in CNF:
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨  b^{12, 30}_2
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_1
c     b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨  b^{12, 30}_0
c  in DIMACS:
 11789  11790  11791  348  11792 0
 11789  11790  11791  348 -11793 0
 11789  11790  11791  348  11794 0

c  -1-1 --> -2
c    ( b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧  b^{12, 29}_0 ∧ -p_348) -> ( b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0)
c  in CNF:
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨  b^{12, 30}_2
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨  b^{12, 30}_1
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨  p_348 ∨ -b^{12, 30}_0
c  in DIMACS:
-11789  11790 -11791  348  11792 0
-11789  11790 -11791  348  11793 0
-11789  11790 -11791  348 -11794 0

c  -2-1 --> break 
c    ( b^{12, 29}_2 ∧  b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨  b^{12, 29}_0 ∨  p_348 ∨ break
c  in DIMACS:
-11789 -11790  11791  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 29}_2 ∧ -b^{12, 29}_1 ∧ -b^{12, 29}_0 ∧ true) 
c  in CNF:
c    -b^{12, 29}_2 ∨  b^{12, 29}_1 ∨  b^{12, 29}_0 ∨ false 
c  in DIMACS:
-11789  11790  11791  0

c  3 does not represent an automaton state.
c    -(-b^{12, 29}_2 ∧  b^{12, 29}_1 ∧  b^{12, 29}_0 ∧ true) 
c  in CNF:
c     b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ false 
c  in DIMACS:
 11789 -11790 -11791  0
c  -3 does not represent an automaton state.
c    -( b^{12, 29}_2 ∧  b^{12, 29}_1 ∧  b^{12, 29}_0 ∧ true) 
c  in CNF:
c    -b^{12, 29}_2 ∨ -b^{12, 29}_1 ∨ -b^{12, 29}_0 ∨ false 
c  in DIMACS:
-11789 -11790 -11791  0

c i = 30
c  -2+1 --> -1
c    ( b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧  p_360) -> ( b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0)
c  in CNF:
c    -b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨  b^{12, 31}_2
c    -b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_1
c    -b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨  b^{12, 31}_0
c  in DIMACS:
-11792 -11793  11794 -360  11795 0
-11792 -11793  11794 -360 -11796 0
-11792 -11793  11794 -360  11797 0

c  -1+1 --> 0
c    ( b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0 ∧  p_360) -> (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧ -b^{12, 31}_0)
c  in CNF:
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_2
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_1
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_0
c  in DIMACS:
-11792  11793 -11794 -360 -11795 0
-11792  11793 -11794 -360 -11796 0
-11792  11793 -11794 -360 -11797 0

c  0+1 --> 1
c    (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧  p_360) -> (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0)
c  in CNF:
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_2
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_1
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨  b^{12, 31}_0
c  in DIMACS:
 11792  11793  11794 -360 -11795 0
 11792  11793  11794 -360 -11796 0
 11792  11793  11794 -360  11797 0

c  1+1 --> 2
c    (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0 ∧  p_360) -> (-b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0)
c  in CNF:
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_2
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨  b^{12, 31}_1
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ -p_360 ∨ -b^{12, 31}_0
c  in DIMACS:
 11792  11793 -11794 -360 -11795 0
 11792  11793 -11794 -360  11796 0
 11792  11793 -11794 -360 -11797 0

c  2+1 --> break 
c    (-b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧  p_360) -> break
c  in CNF:
c     b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 11792 -11793  11794 -360 1162 0


c  2-1 --> 1
c    (-b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧ -p_360) -> (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0)
c  in CNF:
c     b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_2
c     b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_1
c     b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨  b^{12, 31}_0
c  in DIMACS:
 11792 -11793  11794  360 -11795 0
 11792 -11793  11794  360 -11796 0
 11792 -11793  11794  360  11797 0

c  1-1 --> 0
c    (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0 ∧ -p_360) -> (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧ -b^{12, 31}_0)
c  in CNF:
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_2
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_1
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_0
c  in DIMACS:
 11792  11793 -11794  360 -11795 0
 11792  11793 -11794  360 -11796 0
 11792  11793 -11794  360 -11797 0

c  0-1 --> -1
c    (-b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧ -p_360) -> ( b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0)
c  in CNF:
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨  b^{12, 31}_2
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_1
c     b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨  b^{12, 31}_0
c  in DIMACS:
 11792  11793  11794  360  11795 0
 11792  11793  11794  360 -11796 0
 11792  11793  11794  360  11797 0

c  -1-1 --> -2
c    ( b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧  b^{12, 30}_0 ∧ -p_360) -> ( b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0)
c  in CNF:
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨  b^{12, 31}_2
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨  b^{12, 31}_1
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨  p_360 ∨ -b^{12, 31}_0
c  in DIMACS:
-11792  11793 -11794  360  11795 0
-11792  11793 -11794  360  11796 0
-11792  11793 -11794  360 -11797 0

c  -2-1 --> break 
c    ( b^{12, 30}_2 ∧  b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨  b^{12, 30}_0 ∨  p_360 ∨ break
c  in DIMACS:
-11792 -11793  11794  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 30}_2 ∧ -b^{12, 30}_1 ∧ -b^{12, 30}_0 ∧ true) 
c  in CNF:
c    -b^{12, 30}_2 ∨  b^{12, 30}_1 ∨  b^{12, 30}_0 ∨ false 
c  in DIMACS:
-11792  11793  11794  0

c  3 does not represent an automaton state.
c    -(-b^{12, 30}_2 ∧  b^{12, 30}_1 ∧  b^{12, 30}_0 ∧ true) 
c  in CNF:
c     b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ false 
c  in DIMACS:
 11792 -11793 -11794  0
c  -3 does not represent an automaton state.
c    -( b^{12, 30}_2 ∧  b^{12, 30}_1 ∧  b^{12, 30}_0 ∧ true) 
c  in CNF:
c    -b^{12, 30}_2 ∨ -b^{12, 30}_1 ∨ -b^{12, 30}_0 ∨ false 
c  in DIMACS:
-11792 -11793 -11794  0

c i = 31
c  -2+1 --> -1
c    ( b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧  p_372) -> ( b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0)
c  in CNF:
c    -b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨  b^{12, 32}_2
c    -b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_1
c    -b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨  b^{12, 32}_0
c  in DIMACS:
-11795 -11796  11797 -372  11798 0
-11795 -11796  11797 -372 -11799 0
-11795 -11796  11797 -372  11800 0

c  -1+1 --> 0
c    ( b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0 ∧  p_372) -> (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧ -b^{12, 32}_0)
c  in CNF:
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_2
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_1
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_0
c  in DIMACS:
-11795  11796 -11797 -372 -11798 0
-11795  11796 -11797 -372 -11799 0
-11795  11796 -11797 -372 -11800 0

c  0+1 --> 1
c    (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧  p_372) -> (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0)
c  in CNF:
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_2
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_1
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨  b^{12, 32}_0
c  in DIMACS:
 11795  11796  11797 -372 -11798 0
 11795  11796  11797 -372 -11799 0
 11795  11796  11797 -372  11800 0

c  1+1 --> 2
c    (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0 ∧  p_372) -> (-b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0)
c  in CNF:
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_2
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨  b^{12, 32}_1
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ -p_372 ∨ -b^{12, 32}_0
c  in DIMACS:
 11795  11796 -11797 -372 -11798 0
 11795  11796 -11797 -372  11799 0
 11795  11796 -11797 -372 -11800 0

c  2+1 --> break 
c    (-b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧  p_372) -> break
c  in CNF:
c     b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 11795 -11796  11797 -372 1162 0


c  2-1 --> 1
c    (-b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧ -p_372) -> (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0)
c  in CNF:
c     b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_2
c     b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_1
c     b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨  b^{12, 32}_0
c  in DIMACS:
 11795 -11796  11797  372 -11798 0
 11795 -11796  11797  372 -11799 0
 11795 -11796  11797  372  11800 0

c  1-1 --> 0
c    (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0 ∧ -p_372) -> (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧ -b^{12, 32}_0)
c  in CNF:
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_2
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_1
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_0
c  in DIMACS:
 11795  11796 -11797  372 -11798 0
 11795  11796 -11797  372 -11799 0
 11795  11796 -11797  372 -11800 0

c  0-1 --> -1
c    (-b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧ -p_372) -> ( b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0)
c  in CNF:
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨  b^{12, 32}_2
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_1
c     b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨  b^{12, 32}_0
c  in DIMACS:
 11795  11796  11797  372  11798 0
 11795  11796  11797  372 -11799 0
 11795  11796  11797  372  11800 0

c  -1-1 --> -2
c    ( b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧  b^{12, 31}_0 ∧ -p_372) -> ( b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0)
c  in CNF:
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨  b^{12, 32}_2
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨  b^{12, 32}_1
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨  p_372 ∨ -b^{12, 32}_0
c  in DIMACS:
-11795  11796 -11797  372  11798 0
-11795  11796 -11797  372  11799 0
-11795  11796 -11797  372 -11800 0

c  -2-1 --> break 
c    ( b^{12, 31}_2 ∧  b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨  b^{12, 31}_0 ∨  p_372 ∨ break
c  in DIMACS:
-11795 -11796  11797  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 31}_2 ∧ -b^{12, 31}_1 ∧ -b^{12, 31}_0 ∧ true) 
c  in CNF:
c    -b^{12, 31}_2 ∨  b^{12, 31}_1 ∨  b^{12, 31}_0 ∨ false 
c  in DIMACS:
-11795  11796  11797  0

c  3 does not represent an automaton state.
c    -(-b^{12, 31}_2 ∧  b^{12, 31}_1 ∧  b^{12, 31}_0 ∧ true) 
c  in CNF:
c     b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ false 
c  in DIMACS:
 11795 -11796 -11797  0
c  -3 does not represent an automaton state.
c    -( b^{12, 31}_2 ∧  b^{12, 31}_1 ∧  b^{12, 31}_0 ∧ true) 
c  in CNF:
c    -b^{12, 31}_2 ∨ -b^{12, 31}_1 ∨ -b^{12, 31}_0 ∨ false 
c  in DIMACS:
-11795 -11796 -11797  0

c i = 32
c  -2+1 --> -1
c    ( b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧  p_384) -> ( b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0)
c  in CNF:
c    -b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨  b^{12, 33}_2
c    -b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_1
c    -b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨  b^{12, 33}_0
c  in DIMACS:
-11798 -11799  11800 -384  11801 0
-11798 -11799  11800 -384 -11802 0
-11798 -11799  11800 -384  11803 0

c  -1+1 --> 0
c    ( b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0 ∧  p_384) -> (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧ -b^{12, 33}_0)
c  in CNF:
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_2
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_1
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_0
c  in DIMACS:
-11798  11799 -11800 -384 -11801 0
-11798  11799 -11800 -384 -11802 0
-11798  11799 -11800 -384 -11803 0

c  0+1 --> 1
c    (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧  p_384) -> (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0)
c  in CNF:
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_2
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_1
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨  b^{12, 33}_0
c  in DIMACS:
 11798  11799  11800 -384 -11801 0
 11798  11799  11800 -384 -11802 0
 11798  11799  11800 -384  11803 0

c  1+1 --> 2
c    (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0 ∧  p_384) -> (-b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0)
c  in CNF:
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_2
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨  b^{12, 33}_1
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ -p_384 ∨ -b^{12, 33}_0
c  in DIMACS:
 11798  11799 -11800 -384 -11801 0
 11798  11799 -11800 -384  11802 0
 11798  11799 -11800 -384 -11803 0

c  2+1 --> break 
c    (-b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧  p_384) -> break
c  in CNF:
c     b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 11798 -11799  11800 -384 1162 0


c  2-1 --> 1
c    (-b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧ -p_384) -> (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0)
c  in CNF:
c     b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_2
c     b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_1
c     b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨  b^{12, 33}_0
c  in DIMACS:
 11798 -11799  11800  384 -11801 0
 11798 -11799  11800  384 -11802 0
 11798 -11799  11800  384  11803 0

c  1-1 --> 0
c    (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0 ∧ -p_384) -> (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧ -b^{12, 33}_0)
c  in CNF:
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_2
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_1
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_0
c  in DIMACS:
 11798  11799 -11800  384 -11801 0
 11798  11799 -11800  384 -11802 0
 11798  11799 -11800  384 -11803 0

c  0-1 --> -1
c    (-b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧ -p_384) -> ( b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0)
c  in CNF:
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨  b^{12, 33}_2
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_1
c     b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨  b^{12, 33}_0
c  in DIMACS:
 11798  11799  11800  384  11801 0
 11798  11799  11800  384 -11802 0
 11798  11799  11800  384  11803 0

c  -1-1 --> -2
c    ( b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧  b^{12, 32}_0 ∧ -p_384) -> ( b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0)
c  in CNF:
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨  b^{12, 33}_2
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨  b^{12, 33}_1
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨  p_384 ∨ -b^{12, 33}_0
c  in DIMACS:
-11798  11799 -11800  384  11801 0
-11798  11799 -11800  384  11802 0
-11798  11799 -11800  384 -11803 0

c  -2-1 --> break 
c    ( b^{12, 32}_2 ∧  b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨  b^{12, 32}_0 ∨  p_384 ∨ break
c  in DIMACS:
-11798 -11799  11800  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 32}_2 ∧ -b^{12, 32}_1 ∧ -b^{12, 32}_0 ∧ true) 
c  in CNF:
c    -b^{12, 32}_2 ∨  b^{12, 32}_1 ∨  b^{12, 32}_0 ∨ false 
c  in DIMACS:
-11798  11799  11800  0

c  3 does not represent an automaton state.
c    -(-b^{12, 32}_2 ∧  b^{12, 32}_1 ∧  b^{12, 32}_0 ∧ true) 
c  in CNF:
c     b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ false 
c  in DIMACS:
 11798 -11799 -11800  0
c  -3 does not represent an automaton state.
c    -( b^{12, 32}_2 ∧  b^{12, 32}_1 ∧  b^{12, 32}_0 ∧ true) 
c  in CNF:
c    -b^{12, 32}_2 ∨ -b^{12, 32}_1 ∨ -b^{12, 32}_0 ∨ false 
c  in DIMACS:
-11798 -11799 -11800  0

c i = 33
c  -2+1 --> -1
c    ( b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧  p_396) -> ( b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0)
c  in CNF:
c    -b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨  b^{12, 34}_2
c    -b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_1
c    -b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨  b^{12, 34}_0
c  in DIMACS:
-11801 -11802  11803 -396  11804 0
-11801 -11802  11803 -396 -11805 0
-11801 -11802  11803 -396  11806 0

c  -1+1 --> 0
c    ( b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0 ∧  p_396) -> (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧ -b^{12, 34}_0)
c  in CNF:
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_2
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_1
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_0
c  in DIMACS:
-11801  11802 -11803 -396 -11804 0
-11801  11802 -11803 -396 -11805 0
-11801  11802 -11803 -396 -11806 0

c  0+1 --> 1
c    (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧  p_396) -> (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0)
c  in CNF:
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_2
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_1
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨  b^{12, 34}_0
c  in DIMACS:
 11801  11802  11803 -396 -11804 0
 11801  11802  11803 -396 -11805 0
 11801  11802  11803 -396  11806 0

c  1+1 --> 2
c    (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0 ∧  p_396) -> (-b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0)
c  in CNF:
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_2
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨  b^{12, 34}_1
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ -p_396 ∨ -b^{12, 34}_0
c  in DIMACS:
 11801  11802 -11803 -396 -11804 0
 11801  11802 -11803 -396  11805 0
 11801  11802 -11803 -396 -11806 0

c  2+1 --> break 
c    (-b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧  p_396) -> break
c  in CNF:
c     b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 11801 -11802  11803 -396 1162 0


c  2-1 --> 1
c    (-b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧ -p_396) -> (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0)
c  in CNF:
c     b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_2
c     b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_1
c     b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨  b^{12, 34}_0
c  in DIMACS:
 11801 -11802  11803  396 -11804 0
 11801 -11802  11803  396 -11805 0
 11801 -11802  11803  396  11806 0

c  1-1 --> 0
c    (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0 ∧ -p_396) -> (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧ -b^{12, 34}_0)
c  in CNF:
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_2
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_1
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_0
c  in DIMACS:
 11801  11802 -11803  396 -11804 0
 11801  11802 -11803  396 -11805 0
 11801  11802 -11803  396 -11806 0

c  0-1 --> -1
c    (-b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧ -p_396) -> ( b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0)
c  in CNF:
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨  b^{12, 34}_2
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_1
c     b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨  b^{12, 34}_0
c  in DIMACS:
 11801  11802  11803  396  11804 0
 11801  11802  11803  396 -11805 0
 11801  11802  11803  396  11806 0

c  -1-1 --> -2
c    ( b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧  b^{12, 33}_0 ∧ -p_396) -> ( b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0)
c  in CNF:
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨  b^{12, 34}_2
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨  b^{12, 34}_1
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨  p_396 ∨ -b^{12, 34}_0
c  in DIMACS:
-11801  11802 -11803  396  11804 0
-11801  11802 -11803  396  11805 0
-11801  11802 -11803  396 -11806 0

c  -2-1 --> break 
c    ( b^{12, 33}_2 ∧  b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨  b^{12, 33}_0 ∨  p_396 ∨ break
c  in DIMACS:
-11801 -11802  11803  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 33}_2 ∧ -b^{12, 33}_1 ∧ -b^{12, 33}_0 ∧ true) 
c  in CNF:
c    -b^{12, 33}_2 ∨  b^{12, 33}_1 ∨  b^{12, 33}_0 ∨ false 
c  in DIMACS:
-11801  11802  11803  0

c  3 does not represent an automaton state.
c    -(-b^{12, 33}_2 ∧  b^{12, 33}_1 ∧  b^{12, 33}_0 ∧ true) 
c  in CNF:
c     b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ false 
c  in DIMACS:
 11801 -11802 -11803  0
c  -3 does not represent an automaton state.
c    -( b^{12, 33}_2 ∧  b^{12, 33}_1 ∧  b^{12, 33}_0 ∧ true) 
c  in CNF:
c    -b^{12, 33}_2 ∨ -b^{12, 33}_1 ∨ -b^{12, 33}_0 ∨ false 
c  in DIMACS:
-11801 -11802 -11803  0

c i = 34
c  -2+1 --> -1
c    ( b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧  p_408) -> ( b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0)
c  in CNF:
c    -b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨  b^{12, 35}_2
c    -b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_1
c    -b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨  b^{12, 35}_0
c  in DIMACS:
-11804 -11805  11806 -408  11807 0
-11804 -11805  11806 -408 -11808 0
-11804 -11805  11806 -408  11809 0

c  -1+1 --> 0
c    ( b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0 ∧  p_408) -> (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧ -b^{12, 35}_0)
c  in CNF:
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_2
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_1
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_0
c  in DIMACS:
-11804  11805 -11806 -408 -11807 0
-11804  11805 -11806 -408 -11808 0
-11804  11805 -11806 -408 -11809 0

c  0+1 --> 1
c    (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧  p_408) -> (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0)
c  in CNF:
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_2
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_1
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨  b^{12, 35}_0
c  in DIMACS:
 11804  11805  11806 -408 -11807 0
 11804  11805  11806 -408 -11808 0
 11804  11805  11806 -408  11809 0

c  1+1 --> 2
c    (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0 ∧  p_408) -> (-b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0)
c  in CNF:
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_2
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨  b^{12, 35}_1
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ -p_408 ∨ -b^{12, 35}_0
c  in DIMACS:
 11804  11805 -11806 -408 -11807 0
 11804  11805 -11806 -408  11808 0
 11804  11805 -11806 -408 -11809 0

c  2+1 --> break 
c    (-b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧  p_408) -> break
c  in CNF:
c     b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 11804 -11805  11806 -408 1162 0


c  2-1 --> 1
c    (-b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧ -p_408) -> (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0)
c  in CNF:
c     b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_2
c     b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_1
c     b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨  b^{12, 35}_0
c  in DIMACS:
 11804 -11805  11806  408 -11807 0
 11804 -11805  11806  408 -11808 0
 11804 -11805  11806  408  11809 0

c  1-1 --> 0
c    (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0 ∧ -p_408) -> (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧ -b^{12, 35}_0)
c  in CNF:
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_2
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_1
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_0
c  in DIMACS:
 11804  11805 -11806  408 -11807 0
 11804  11805 -11806  408 -11808 0
 11804  11805 -11806  408 -11809 0

c  0-1 --> -1
c    (-b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧ -p_408) -> ( b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0)
c  in CNF:
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨  b^{12, 35}_2
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_1
c     b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨  b^{12, 35}_0
c  in DIMACS:
 11804  11805  11806  408  11807 0
 11804  11805  11806  408 -11808 0
 11804  11805  11806  408  11809 0

c  -1-1 --> -2
c    ( b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧  b^{12, 34}_0 ∧ -p_408) -> ( b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0)
c  in CNF:
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨  b^{12, 35}_2
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨  b^{12, 35}_1
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨  p_408 ∨ -b^{12, 35}_0
c  in DIMACS:
-11804  11805 -11806  408  11807 0
-11804  11805 -11806  408  11808 0
-11804  11805 -11806  408 -11809 0

c  -2-1 --> break 
c    ( b^{12, 34}_2 ∧  b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨  b^{12, 34}_0 ∨  p_408 ∨ break
c  in DIMACS:
-11804 -11805  11806  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 34}_2 ∧ -b^{12, 34}_1 ∧ -b^{12, 34}_0 ∧ true) 
c  in CNF:
c    -b^{12, 34}_2 ∨  b^{12, 34}_1 ∨  b^{12, 34}_0 ∨ false 
c  in DIMACS:
-11804  11805  11806  0

c  3 does not represent an automaton state.
c    -(-b^{12, 34}_2 ∧  b^{12, 34}_1 ∧  b^{12, 34}_0 ∧ true) 
c  in CNF:
c     b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ false 
c  in DIMACS:
 11804 -11805 -11806  0
c  -3 does not represent an automaton state.
c    -( b^{12, 34}_2 ∧  b^{12, 34}_1 ∧  b^{12, 34}_0 ∧ true) 
c  in CNF:
c    -b^{12, 34}_2 ∨ -b^{12, 34}_1 ∨ -b^{12, 34}_0 ∨ false 
c  in DIMACS:
-11804 -11805 -11806  0

c i = 35
c  -2+1 --> -1
c    ( b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧  p_420) -> ( b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0)
c  in CNF:
c    -b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨  b^{12, 36}_2
c    -b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_1
c    -b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨  b^{12, 36}_0
c  in DIMACS:
-11807 -11808  11809 -420  11810 0
-11807 -11808  11809 -420 -11811 0
-11807 -11808  11809 -420  11812 0

c  -1+1 --> 0
c    ( b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0 ∧  p_420) -> (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧ -b^{12, 36}_0)
c  in CNF:
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_2
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_1
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_0
c  in DIMACS:
-11807  11808 -11809 -420 -11810 0
-11807  11808 -11809 -420 -11811 0
-11807  11808 -11809 -420 -11812 0

c  0+1 --> 1
c    (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧  p_420) -> (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0)
c  in CNF:
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_2
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_1
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨  b^{12, 36}_0
c  in DIMACS:
 11807  11808  11809 -420 -11810 0
 11807  11808  11809 -420 -11811 0
 11807  11808  11809 -420  11812 0

c  1+1 --> 2
c    (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0 ∧  p_420) -> (-b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0)
c  in CNF:
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_2
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨  b^{12, 36}_1
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ -p_420 ∨ -b^{12, 36}_0
c  in DIMACS:
 11807  11808 -11809 -420 -11810 0
 11807  11808 -11809 -420  11811 0
 11807  11808 -11809 -420 -11812 0

c  2+1 --> break 
c    (-b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧  p_420) -> break
c  in CNF:
c     b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 11807 -11808  11809 -420 1162 0


c  2-1 --> 1
c    (-b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧ -p_420) -> (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0)
c  in CNF:
c     b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_2
c     b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_1
c     b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨  b^{12, 36}_0
c  in DIMACS:
 11807 -11808  11809  420 -11810 0
 11807 -11808  11809  420 -11811 0
 11807 -11808  11809  420  11812 0

c  1-1 --> 0
c    (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0 ∧ -p_420) -> (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧ -b^{12, 36}_0)
c  in CNF:
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_2
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_1
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_0
c  in DIMACS:
 11807  11808 -11809  420 -11810 0
 11807  11808 -11809  420 -11811 0
 11807  11808 -11809  420 -11812 0

c  0-1 --> -1
c    (-b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧ -p_420) -> ( b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0)
c  in CNF:
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨  b^{12, 36}_2
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_1
c     b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨  b^{12, 36}_0
c  in DIMACS:
 11807  11808  11809  420  11810 0
 11807  11808  11809  420 -11811 0
 11807  11808  11809  420  11812 0

c  -1-1 --> -2
c    ( b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧  b^{12, 35}_0 ∧ -p_420) -> ( b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0)
c  in CNF:
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨  b^{12, 36}_2
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨  b^{12, 36}_1
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨  p_420 ∨ -b^{12, 36}_0
c  in DIMACS:
-11807  11808 -11809  420  11810 0
-11807  11808 -11809  420  11811 0
-11807  11808 -11809  420 -11812 0

c  -2-1 --> break 
c    ( b^{12, 35}_2 ∧  b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨  b^{12, 35}_0 ∨  p_420 ∨ break
c  in DIMACS:
-11807 -11808  11809  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 35}_2 ∧ -b^{12, 35}_1 ∧ -b^{12, 35}_0 ∧ true) 
c  in CNF:
c    -b^{12, 35}_2 ∨  b^{12, 35}_1 ∨  b^{12, 35}_0 ∨ false 
c  in DIMACS:
-11807  11808  11809  0

c  3 does not represent an automaton state.
c    -(-b^{12, 35}_2 ∧  b^{12, 35}_1 ∧  b^{12, 35}_0 ∧ true) 
c  in CNF:
c     b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ false 
c  in DIMACS:
 11807 -11808 -11809  0
c  -3 does not represent an automaton state.
c    -( b^{12, 35}_2 ∧  b^{12, 35}_1 ∧  b^{12, 35}_0 ∧ true) 
c  in CNF:
c    -b^{12, 35}_2 ∨ -b^{12, 35}_1 ∨ -b^{12, 35}_0 ∨ false 
c  in DIMACS:
-11807 -11808 -11809  0

c i = 36
c  -2+1 --> -1
c    ( b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧  p_432) -> ( b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0)
c  in CNF:
c    -b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨  b^{12, 37}_2
c    -b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_1
c    -b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨  b^{12, 37}_0
c  in DIMACS:
-11810 -11811  11812 -432  11813 0
-11810 -11811  11812 -432 -11814 0
-11810 -11811  11812 -432  11815 0

c  -1+1 --> 0
c    ( b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0 ∧  p_432) -> (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧ -b^{12, 37}_0)
c  in CNF:
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_2
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_1
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_0
c  in DIMACS:
-11810  11811 -11812 -432 -11813 0
-11810  11811 -11812 -432 -11814 0
-11810  11811 -11812 -432 -11815 0

c  0+1 --> 1
c    (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧  p_432) -> (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0)
c  in CNF:
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_2
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_1
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨  b^{12, 37}_0
c  in DIMACS:
 11810  11811  11812 -432 -11813 0
 11810  11811  11812 -432 -11814 0
 11810  11811  11812 -432  11815 0

c  1+1 --> 2
c    (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0 ∧  p_432) -> (-b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0)
c  in CNF:
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_2
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨  b^{12, 37}_1
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ -p_432 ∨ -b^{12, 37}_0
c  in DIMACS:
 11810  11811 -11812 -432 -11813 0
 11810  11811 -11812 -432  11814 0
 11810  11811 -11812 -432 -11815 0

c  2+1 --> break 
c    (-b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧  p_432) -> break
c  in CNF:
c     b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 11810 -11811  11812 -432 1162 0


c  2-1 --> 1
c    (-b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧ -p_432) -> (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0)
c  in CNF:
c     b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_2
c     b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_1
c     b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨  b^{12, 37}_0
c  in DIMACS:
 11810 -11811  11812  432 -11813 0
 11810 -11811  11812  432 -11814 0
 11810 -11811  11812  432  11815 0

c  1-1 --> 0
c    (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0 ∧ -p_432) -> (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧ -b^{12, 37}_0)
c  in CNF:
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_2
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_1
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_0
c  in DIMACS:
 11810  11811 -11812  432 -11813 0
 11810  11811 -11812  432 -11814 0
 11810  11811 -11812  432 -11815 0

c  0-1 --> -1
c    (-b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧ -p_432) -> ( b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0)
c  in CNF:
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨  b^{12, 37}_2
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_1
c     b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨  b^{12, 37}_0
c  in DIMACS:
 11810  11811  11812  432  11813 0
 11810  11811  11812  432 -11814 0
 11810  11811  11812  432  11815 0

c  -1-1 --> -2
c    ( b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧  b^{12, 36}_0 ∧ -p_432) -> ( b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0)
c  in CNF:
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨  b^{12, 37}_2
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨  b^{12, 37}_1
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨  p_432 ∨ -b^{12, 37}_0
c  in DIMACS:
-11810  11811 -11812  432  11813 0
-11810  11811 -11812  432  11814 0
-11810  11811 -11812  432 -11815 0

c  -2-1 --> break 
c    ( b^{12, 36}_2 ∧  b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨  b^{12, 36}_0 ∨  p_432 ∨ break
c  in DIMACS:
-11810 -11811  11812  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 36}_2 ∧ -b^{12, 36}_1 ∧ -b^{12, 36}_0 ∧ true) 
c  in CNF:
c    -b^{12, 36}_2 ∨  b^{12, 36}_1 ∨  b^{12, 36}_0 ∨ false 
c  in DIMACS:
-11810  11811  11812  0

c  3 does not represent an automaton state.
c    -(-b^{12, 36}_2 ∧  b^{12, 36}_1 ∧  b^{12, 36}_0 ∧ true) 
c  in CNF:
c     b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ false 
c  in DIMACS:
 11810 -11811 -11812  0
c  -3 does not represent an automaton state.
c    -( b^{12, 36}_2 ∧  b^{12, 36}_1 ∧  b^{12, 36}_0 ∧ true) 
c  in CNF:
c    -b^{12, 36}_2 ∨ -b^{12, 36}_1 ∨ -b^{12, 36}_0 ∨ false 
c  in DIMACS:
-11810 -11811 -11812  0

c i = 37
c  -2+1 --> -1
c    ( b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧  p_444) -> ( b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0)
c  in CNF:
c    -b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨  b^{12, 38}_2
c    -b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_1
c    -b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨  b^{12, 38}_0
c  in DIMACS:
-11813 -11814  11815 -444  11816 0
-11813 -11814  11815 -444 -11817 0
-11813 -11814  11815 -444  11818 0

c  -1+1 --> 0
c    ( b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0 ∧  p_444) -> (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧ -b^{12, 38}_0)
c  in CNF:
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_2
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_1
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_0
c  in DIMACS:
-11813  11814 -11815 -444 -11816 0
-11813  11814 -11815 -444 -11817 0
-11813  11814 -11815 -444 -11818 0

c  0+1 --> 1
c    (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧  p_444) -> (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0)
c  in CNF:
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_2
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_1
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨  b^{12, 38}_0
c  in DIMACS:
 11813  11814  11815 -444 -11816 0
 11813  11814  11815 -444 -11817 0
 11813  11814  11815 -444  11818 0

c  1+1 --> 2
c    (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0 ∧  p_444) -> (-b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0)
c  in CNF:
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_2
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨  b^{12, 38}_1
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ -p_444 ∨ -b^{12, 38}_0
c  in DIMACS:
 11813  11814 -11815 -444 -11816 0
 11813  11814 -11815 -444  11817 0
 11813  11814 -11815 -444 -11818 0

c  2+1 --> break 
c    (-b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧  p_444) -> break
c  in CNF:
c     b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 11813 -11814  11815 -444 1162 0


c  2-1 --> 1
c    (-b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧ -p_444) -> (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0)
c  in CNF:
c     b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_2
c     b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_1
c     b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨  b^{12, 38}_0
c  in DIMACS:
 11813 -11814  11815  444 -11816 0
 11813 -11814  11815  444 -11817 0
 11813 -11814  11815  444  11818 0

c  1-1 --> 0
c    (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0 ∧ -p_444) -> (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧ -b^{12, 38}_0)
c  in CNF:
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_2
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_1
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_0
c  in DIMACS:
 11813  11814 -11815  444 -11816 0
 11813  11814 -11815  444 -11817 0
 11813  11814 -11815  444 -11818 0

c  0-1 --> -1
c    (-b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧ -p_444) -> ( b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0)
c  in CNF:
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨  b^{12, 38}_2
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_1
c     b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨  b^{12, 38}_0
c  in DIMACS:
 11813  11814  11815  444  11816 0
 11813  11814  11815  444 -11817 0
 11813  11814  11815  444  11818 0

c  -1-1 --> -2
c    ( b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧  b^{12, 37}_0 ∧ -p_444) -> ( b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0)
c  in CNF:
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨  b^{12, 38}_2
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨  b^{12, 38}_1
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨  p_444 ∨ -b^{12, 38}_0
c  in DIMACS:
-11813  11814 -11815  444  11816 0
-11813  11814 -11815  444  11817 0
-11813  11814 -11815  444 -11818 0

c  -2-1 --> break 
c    ( b^{12, 37}_2 ∧  b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨  b^{12, 37}_0 ∨  p_444 ∨ break
c  in DIMACS:
-11813 -11814  11815  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 37}_2 ∧ -b^{12, 37}_1 ∧ -b^{12, 37}_0 ∧ true) 
c  in CNF:
c    -b^{12, 37}_2 ∨  b^{12, 37}_1 ∨  b^{12, 37}_0 ∨ false 
c  in DIMACS:
-11813  11814  11815  0

c  3 does not represent an automaton state.
c    -(-b^{12, 37}_2 ∧  b^{12, 37}_1 ∧  b^{12, 37}_0 ∧ true) 
c  in CNF:
c     b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ false 
c  in DIMACS:
 11813 -11814 -11815  0
c  -3 does not represent an automaton state.
c    -( b^{12, 37}_2 ∧  b^{12, 37}_1 ∧  b^{12, 37}_0 ∧ true) 
c  in CNF:
c    -b^{12, 37}_2 ∨ -b^{12, 37}_1 ∨ -b^{12, 37}_0 ∨ false 
c  in DIMACS:
-11813 -11814 -11815  0

c i = 38
c  -2+1 --> -1
c    ( b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧  p_456) -> ( b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0)
c  in CNF:
c    -b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨  b^{12, 39}_2
c    -b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_1
c    -b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨  b^{12, 39}_0
c  in DIMACS:
-11816 -11817  11818 -456  11819 0
-11816 -11817  11818 -456 -11820 0
-11816 -11817  11818 -456  11821 0

c  -1+1 --> 0
c    ( b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0 ∧  p_456) -> (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧ -b^{12, 39}_0)
c  in CNF:
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_2
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_1
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_0
c  in DIMACS:
-11816  11817 -11818 -456 -11819 0
-11816  11817 -11818 -456 -11820 0
-11816  11817 -11818 -456 -11821 0

c  0+1 --> 1
c    (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧  p_456) -> (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0)
c  in CNF:
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_2
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_1
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨  b^{12, 39}_0
c  in DIMACS:
 11816  11817  11818 -456 -11819 0
 11816  11817  11818 -456 -11820 0
 11816  11817  11818 -456  11821 0

c  1+1 --> 2
c    (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0 ∧  p_456) -> (-b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0)
c  in CNF:
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_2
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨  b^{12, 39}_1
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ -p_456 ∨ -b^{12, 39}_0
c  in DIMACS:
 11816  11817 -11818 -456 -11819 0
 11816  11817 -11818 -456  11820 0
 11816  11817 -11818 -456 -11821 0

c  2+1 --> break 
c    (-b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧  p_456) -> break
c  in CNF:
c     b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 11816 -11817  11818 -456 1162 0


c  2-1 --> 1
c    (-b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧ -p_456) -> (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0)
c  in CNF:
c     b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_2
c     b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_1
c     b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨  b^{12, 39}_0
c  in DIMACS:
 11816 -11817  11818  456 -11819 0
 11816 -11817  11818  456 -11820 0
 11816 -11817  11818  456  11821 0

c  1-1 --> 0
c    (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0 ∧ -p_456) -> (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧ -b^{12, 39}_0)
c  in CNF:
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_2
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_1
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_0
c  in DIMACS:
 11816  11817 -11818  456 -11819 0
 11816  11817 -11818  456 -11820 0
 11816  11817 -11818  456 -11821 0

c  0-1 --> -1
c    (-b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧ -p_456) -> ( b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0)
c  in CNF:
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨  b^{12, 39}_2
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_1
c     b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨  b^{12, 39}_0
c  in DIMACS:
 11816  11817  11818  456  11819 0
 11816  11817  11818  456 -11820 0
 11816  11817  11818  456  11821 0

c  -1-1 --> -2
c    ( b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧  b^{12, 38}_0 ∧ -p_456) -> ( b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0)
c  in CNF:
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨  b^{12, 39}_2
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨  b^{12, 39}_1
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨  p_456 ∨ -b^{12, 39}_0
c  in DIMACS:
-11816  11817 -11818  456  11819 0
-11816  11817 -11818  456  11820 0
-11816  11817 -11818  456 -11821 0

c  -2-1 --> break 
c    ( b^{12, 38}_2 ∧  b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨  b^{12, 38}_0 ∨  p_456 ∨ break
c  in DIMACS:
-11816 -11817  11818  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 38}_2 ∧ -b^{12, 38}_1 ∧ -b^{12, 38}_0 ∧ true) 
c  in CNF:
c    -b^{12, 38}_2 ∨  b^{12, 38}_1 ∨  b^{12, 38}_0 ∨ false 
c  in DIMACS:
-11816  11817  11818  0

c  3 does not represent an automaton state.
c    -(-b^{12, 38}_2 ∧  b^{12, 38}_1 ∧  b^{12, 38}_0 ∧ true) 
c  in CNF:
c     b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ false 
c  in DIMACS:
 11816 -11817 -11818  0
c  -3 does not represent an automaton state.
c    -( b^{12, 38}_2 ∧  b^{12, 38}_1 ∧  b^{12, 38}_0 ∧ true) 
c  in CNF:
c    -b^{12, 38}_2 ∨ -b^{12, 38}_1 ∨ -b^{12, 38}_0 ∨ false 
c  in DIMACS:
-11816 -11817 -11818  0

c i = 39
c  -2+1 --> -1
c    ( b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧  p_468) -> ( b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0)
c  in CNF:
c    -b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨  b^{12, 40}_2
c    -b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_1
c    -b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨  b^{12, 40}_0
c  in DIMACS:
-11819 -11820  11821 -468  11822 0
-11819 -11820  11821 -468 -11823 0
-11819 -11820  11821 -468  11824 0

c  -1+1 --> 0
c    ( b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0 ∧  p_468) -> (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧ -b^{12, 40}_0)
c  in CNF:
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_2
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_1
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_0
c  in DIMACS:
-11819  11820 -11821 -468 -11822 0
-11819  11820 -11821 -468 -11823 0
-11819  11820 -11821 -468 -11824 0

c  0+1 --> 1
c    (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧  p_468) -> (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0)
c  in CNF:
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_2
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_1
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨  b^{12, 40}_0
c  in DIMACS:
 11819  11820  11821 -468 -11822 0
 11819  11820  11821 -468 -11823 0
 11819  11820  11821 -468  11824 0

c  1+1 --> 2
c    (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0 ∧  p_468) -> (-b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0)
c  in CNF:
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_2
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨  b^{12, 40}_1
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ -p_468 ∨ -b^{12, 40}_0
c  in DIMACS:
 11819  11820 -11821 -468 -11822 0
 11819  11820 -11821 -468  11823 0
 11819  11820 -11821 -468 -11824 0

c  2+1 --> break 
c    (-b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧  p_468) -> break
c  in CNF:
c     b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 11819 -11820  11821 -468 1162 0


c  2-1 --> 1
c    (-b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧ -p_468) -> (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0)
c  in CNF:
c     b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_2
c     b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_1
c     b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨  b^{12, 40}_0
c  in DIMACS:
 11819 -11820  11821  468 -11822 0
 11819 -11820  11821  468 -11823 0
 11819 -11820  11821  468  11824 0

c  1-1 --> 0
c    (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0 ∧ -p_468) -> (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧ -b^{12, 40}_0)
c  in CNF:
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_2
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_1
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_0
c  in DIMACS:
 11819  11820 -11821  468 -11822 0
 11819  11820 -11821  468 -11823 0
 11819  11820 -11821  468 -11824 0

c  0-1 --> -1
c    (-b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧ -p_468) -> ( b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0)
c  in CNF:
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨  b^{12, 40}_2
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_1
c     b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨  b^{12, 40}_0
c  in DIMACS:
 11819  11820  11821  468  11822 0
 11819  11820  11821  468 -11823 0
 11819  11820  11821  468  11824 0

c  -1-1 --> -2
c    ( b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧  b^{12, 39}_0 ∧ -p_468) -> ( b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0)
c  in CNF:
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨  b^{12, 40}_2
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨  b^{12, 40}_1
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨  p_468 ∨ -b^{12, 40}_0
c  in DIMACS:
-11819  11820 -11821  468  11822 0
-11819  11820 -11821  468  11823 0
-11819  11820 -11821  468 -11824 0

c  -2-1 --> break 
c    ( b^{12, 39}_2 ∧  b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨  b^{12, 39}_0 ∨  p_468 ∨ break
c  in DIMACS:
-11819 -11820  11821  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 39}_2 ∧ -b^{12, 39}_1 ∧ -b^{12, 39}_0 ∧ true) 
c  in CNF:
c    -b^{12, 39}_2 ∨  b^{12, 39}_1 ∨  b^{12, 39}_0 ∨ false 
c  in DIMACS:
-11819  11820  11821  0

c  3 does not represent an automaton state.
c    -(-b^{12, 39}_2 ∧  b^{12, 39}_1 ∧  b^{12, 39}_0 ∧ true) 
c  in CNF:
c     b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ false 
c  in DIMACS:
 11819 -11820 -11821  0
c  -3 does not represent an automaton state.
c    -( b^{12, 39}_2 ∧  b^{12, 39}_1 ∧  b^{12, 39}_0 ∧ true) 
c  in CNF:
c    -b^{12, 39}_2 ∨ -b^{12, 39}_1 ∨ -b^{12, 39}_0 ∨ false 
c  in DIMACS:
-11819 -11820 -11821  0

c i = 40
c  -2+1 --> -1
c    ( b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧  p_480) -> ( b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0)
c  in CNF:
c    -b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨  b^{12, 41}_2
c    -b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_1
c    -b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨  b^{12, 41}_0
c  in DIMACS:
-11822 -11823  11824 -480  11825 0
-11822 -11823  11824 -480 -11826 0
-11822 -11823  11824 -480  11827 0

c  -1+1 --> 0
c    ( b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0 ∧  p_480) -> (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧ -b^{12, 41}_0)
c  in CNF:
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_2
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_1
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_0
c  in DIMACS:
-11822  11823 -11824 -480 -11825 0
-11822  11823 -11824 -480 -11826 0
-11822  11823 -11824 -480 -11827 0

c  0+1 --> 1
c    (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧  p_480) -> (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0)
c  in CNF:
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_2
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_1
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨  b^{12, 41}_0
c  in DIMACS:
 11822  11823  11824 -480 -11825 0
 11822  11823  11824 -480 -11826 0
 11822  11823  11824 -480  11827 0

c  1+1 --> 2
c    (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0 ∧  p_480) -> (-b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0)
c  in CNF:
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_2
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨  b^{12, 41}_1
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ -p_480 ∨ -b^{12, 41}_0
c  in DIMACS:
 11822  11823 -11824 -480 -11825 0
 11822  11823 -11824 -480  11826 0
 11822  11823 -11824 -480 -11827 0

c  2+1 --> break 
c    (-b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧  p_480) -> break
c  in CNF:
c     b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 11822 -11823  11824 -480 1162 0


c  2-1 --> 1
c    (-b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧ -p_480) -> (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0)
c  in CNF:
c     b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_2
c     b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_1
c     b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨  b^{12, 41}_0
c  in DIMACS:
 11822 -11823  11824  480 -11825 0
 11822 -11823  11824  480 -11826 0
 11822 -11823  11824  480  11827 0

c  1-1 --> 0
c    (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0 ∧ -p_480) -> (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧ -b^{12, 41}_0)
c  in CNF:
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_2
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_1
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_0
c  in DIMACS:
 11822  11823 -11824  480 -11825 0
 11822  11823 -11824  480 -11826 0
 11822  11823 -11824  480 -11827 0

c  0-1 --> -1
c    (-b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧ -p_480) -> ( b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0)
c  in CNF:
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨  b^{12, 41}_2
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_1
c     b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨  b^{12, 41}_0
c  in DIMACS:
 11822  11823  11824  480  11825 0
 11822  11823  11824  480 -11826 0
 11822  11823  11824  480  11827 0

c  -1-1 --> -2
c    ( b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧  b^{12, 40}_0 ∧ -p_480) -> ( b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0)
c  in CNF:
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨  b^{12, 41}_2
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨  b^{12, 41}_1
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨  p_480 ∨ -b^{12, 41}_0
c  in DIMACS:
-11822  11823 -11824  480  11825 0
-11822  11823 -11824  480  11826 0
-11822  11823 -11824  480 -11827 0

c  -2-1 --> break 
c    ( b^{12, 40}_2 ∧  b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨  b^{12, 40}_0 ∨  p_480 ∨ break
c  in DIMACS:
-11822 -11823  11824  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 40}_2 ∧ -b^{12, 40}_1 ∧ -b^{12, 40}_0 ∧ true) 
c  in CNF:
c    -b^{12, 40}_2 ∨  b^{12, 40}_1 ∨  b^{12, 40}_0 ∨ false 
c  in DIMACS:
-11822  11823  11824  0

c  3 does not represent an automaton state.
c    -(-b^{12, 40}_2 ∧  b^{12, 40}_1 ∧  b^{12, 40}_0 ∧ true) 
c  in CNF:
c     b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ false 
c  in DIMACS:
 11822 -11823 -11824  0
c  -3 does not represent an automaton state.
c    -( b^{12, 40}_2 ∧  b^{12, 40}_1 ∧  b^{12, 40}_0 ∧ true) 
c  in CNF:
c    -b^{12, 40}_2 ∨ -b^{12, 40}_1 ∨ -b^{12, 40}_0 ∨ false 
c  in DIMACS:
-11822 -11823 -11824  0

c i = 41
c  -2+1 --> -1
c    ( b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧  p_492) -> ( b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0)
c  in CNF:
c    -b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨  b^{12, 42}_2
c    -b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_1
c    -b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨  b^{12, 42}_0
c  in DIMACS:
-11825 -11826  11827 -492  11828 0
-11825 -11826  11827 -492 -11829 0
-11825 -11826  11827 -492  11830 0

c  -1+1 --> 0
c    ( b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0 ∧  p_492) -> (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧ -b^{12, 42}_0)
c  in CNF:
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_2
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_1
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_0
c  in DIMACS:
-11825  11826 -11827 -492 -11828 0
-11825  11826 -11827 -492 -11829 0
-11825  11826 -11827 -492 -11830 0

c  0+1 --> 1
c    (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧  p_492) -> (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0)
c  in CNF:
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_2
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_1
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨  b^{12, 42}_0
c  in DIMACS:
 11825  11826  11827 -492 -11828 0
 11825  11826  11827 -492 -11829 0
 11825  11826  11827 -492  11830 0

c  1+1 --> 2
c    (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0 ∧  p_492) -> (-b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0)
c  in CNF:
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_2
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨  b^{12, 42}_1
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ -p_492 ∨ -b^{12, 42}_0
c  in DIMACS:
 11825  11826 -11827 -492 -11828 0
 11825  11826 -11827 -492  11829 0
 11825  11826 -11827 -492 -11830 0

c  2+1 --> break 
c    (-b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧  p_492) -> break
c  in CNF:
c     b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 11825 -11826  11827 -492 1162 0


c  2-1 --> 1
c    (-b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧ -p_492) -> (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0)
c  in CNF:
c     b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_2
c     b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_1
c     b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨  b^{12, 42}_0
c  in DIMACS:
 11825 -11826  11827  492 -11828 0
 11825 -11826  11827  492 -11829 0
 11825 -11826  11827  492  11830 0

c  1-1 --> 0
c    (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0 ∧ -p_492) -> (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧ -b^{12, 42}_0)
c  in CNF:
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_2
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_1
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_0
c  in DIMACS:
 11825  11826 -11827  492 -11828 0
 11825  11826 -11827  492 -11829 0
 11825  11826 -11827  492 -11830 0

c  0-1 --> -1
c    (-b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧ -p_492) -> ( b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0)
c  in CNF:
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨  b^{12, 42}_2
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_1
c     b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨  b^{12, 42}_0
c  in DIMACS:
 11825  11826  11827  492  11828 0
 11825  11826  11827  492 -11829 0
 11825  11826  11827  492  11830 0

c  -1-1 --> -2
c    ( b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧  b^{12, 41}_0 ∧ -p_492) -> ( b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0)
c  in CNF:
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨  b^{12, 42}_2
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨  b^{12, 42}_1
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨  p_492 ∨ -b^{12, 42}_0
c  in DIMACS:
-11825  11826 -11827  492  11828 0
-11825  11826 -11827  492  11829 0
-11825  11826 -11827  492 -11830 0

c  -2-1 --> break 
c    ( b^{12, 41}_2 ∧  b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨  b^{12, 41}_0 ∨  p_492 ∨ break
c  in DIMACS:
-11825 -11826  11827  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 41}_2 ∧ -b^{12, 41}_1 ∧ -b^{12, 41}_0 ∧ true) 
c  in CNF:
c    -b^{12, 41}_2 ∨  b^{12, 41}_1 ∨  b^{12, 41}_0 ∨ false 
c  in DIMACS:
-11825  11826  11827  0

c  3 does not represent an automaton state.
c    -(-b^{12, 41}_2 ∧  b^{12, 41}_1 ∧  b^{12, 41}_0 ∧ true) 
c  in CNF:
c     b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ false 
c  in DIMACS:
 11825 -11826 -11827  0
c  -3 does not represent an automaton state.
c    -( b^{12, 41}_2 ∧  b^{12, 41}_1 ∧  b^{12, 41}_0 ∧ true) 
c  in CNF:
c    -b^{12, 41}_2 ∨ -b^{12, 41}_1 ∨ -b^{12, 41}_0 ∨ false 
c  in DIMACS:
-11825 -11826 -11827  0

c i = 42
c  -2+1 --> -1
c    ( b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧  p_504) -> ( b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0)
c  in CNF:
c    -b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨  b^{12, 43}_2
c    -b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_1
c    -b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨  b^{12, 43}_0
c  in DIMACS:
-11828 -11829  11830 -504  11831 0
-11828 -11829  11830 -504 -11832 0
-11828 -11829  11830 -504  11833 0

c  -1+1 --> 0
c    ( b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0 ∧  p_504) -> (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧ -b^{12, 43}_0)
c  in CNF:
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_2
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_1
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_0
c  in DIMACS:
-11828  11829 -11830 -504 -11831 0
-11828  11829 -11830 -504 -11832 0
-11828  11829 -11830 -504 -11833 0

c  0+1 --> 1
c    (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧  p_504) -> (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0)
c  in CNF:
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_2
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_1
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨  b^{12, 43}_0
c  in DIMACS:
 11828  11829  11830 -504 -11831 0
 11828  11829  11830 -504 -11832 0
 11828  11829  11830 -504  11833 0

c  1+1 --> 2
c    (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0 ∧  p_504) -> (-b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0)
c  in CNF:
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_2
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨  b^{12, 43}_1
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ -p_504 ∨ -b^{12, 43}_0
c  in DIMACS:
 11828  11829 -11830 -504 -11831 0
 11828  11829 -11830 -504  11832 0
 11828  11829 -11830 -504 -11833 0

c  2+1 --> break 
c    (-b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧  p_504) -> break
c  in CNF:
c     b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 11828 -11829  11830 -504 1162 0


c  2-1 --> 1
c    (-b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧ -p_504) -> (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0)
c  in CNF:
c     b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_2
c     b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_1
c     b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨  b^{12, 43}_0
c  in DIMACS:
 11828 -11829  11830  504 -11831 0
 11828 -11829  11830  504 -11832 0
 11828 -11829  11830  504  11833 0

c  1-1 --> 0
c    (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0 ∧ -p_504) -> (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧ -b^{12, 43}_0)
c  in CNF:
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_2
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_1
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_0
c  in DIMACS:
 11828  11829 -11830  504 -11831 0
 11828  11829 -11830  504 -11832 0
 11828  11829 -11830  504 -11833 0

c  0-1 --> -1
c    (-b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧ -p_504) -> ( b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0)
c  in CNF:
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨  b^{12, 43}_2
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_1
c     b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨  b^{12, 43}_0
c  in DIMACS:
 11828  11829  11830  504  11831 0
 11828  11829  11830  504 -11832 0
 11828  11829  11830  504  11833 0

c  -1-1 --> -2
c    ( b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧  b^{12, 42}_0 ∧ -p_504) -> ( b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0)
c  in CNF:
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨  b^{12, 43}_2
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨  b^{12, 43}_1
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨  p_504 ∨ -b^{12, 43}_0
c  in DIMACS:
-11828  11829 -11830  504  11831 0
-11828  11829 -11830  504  11832 0
-11828  11829 -11830  504 -11833 0

c  -2-1 --> break 
c    ( b^{12, 42}_2 ∧  b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨  b^{12, 42}_0 ∨  p_504 ∨ break
c  in DIMACS:
-11828 -11829  11830  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 42}_2 ∧ -b^{12, 42}_1 ∧ -b^{12, 42}_0 ∧ true) 
c  in CNF:
c    -b^{12, 42}_2 ∨  b^{12, 42}_1 ∨  b^{12, 42}_0 ∨ false 
c  in DIMACS:
-11828  11829  11830  0

c  3 does not represent an automaton state.
c    -(-b^{12, 42}_2 ∧  b^{12, 42}_1 ∧  b^{12, 42}_0 ∧ true) 
c  in CNF:
c     b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ false 
c  in DIMACS:
 11828 -11829 -11830  0
c  -3 does not represent an automaton state.
c    -( b^{12, 42}_2 ∧  b^{12, 42}_1 ∧  b^{12, 42}_0 ∧ true) 
c  in CNF:
c    -b^{12, 42}_2 ∨ -b^{12, 42}_1 ∨ -b^{12, 42}_0 ∨ false 
c  in DIMACS:
-11828 -11829 -11830  0

c i = 43
c  -2+1 --> -1
c    ( b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧  p_516) -> ( b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0)
c  in CNF:
c    -b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨  b^{12, 44}_2
c    -b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_1
c    -b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨  b^{12, 44}_0
c  in DIMACS:
-11831 -11832  11833 -516  11834 0
-11831 -11832  11833 -516 -11835 0
-11831 -11832  11833 -516  11836 0

c  -1+1 --> 0
c    ( b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0 ∧  p_516) -> (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧ -b^{12, 44}_0)
c  in CNF:
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_2
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_1
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_0
c  in DIMACS:
-11831  11832 -11833 -516 -11834 0
-11831  11832 -11833 -516 -11835 0
-11831  11832 -11833 -516 -11836 0

c  0+1 --> 1
c    (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧  p_516) -> (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0)
c  in CNF:
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_2
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_1
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨  b^{12, 44}_0
c  in DIMACS:
 11831  11832  11833 -516 -11834 0
 11831  11832  11833 -516 -11835 0
 11831  11832  11833 -516  11836 0

c  1+1 --> 2
c    (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0 ∧  p_516) -> (-b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0)
c  in CNF:
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_2
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨  b^{12, 44}_1
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ -p_516 ∨ -b^{12, 44}_0
c  in DIMACS:
 11831  11832 -11833 -516 -11834 0
 11831  11832 -11833 -516  11835 0
 11831  11832 -11833 -516 -11836 0

c  2+1 --> break 
c    (-b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧  p_516) -> break
c  in CNF:
c     b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 11831 -11832  11833 -516 1162 0


c  2-1 --> 1
c    (-b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧ -p_516) -> (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0)
c  in CNF:
c     b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_2
c     b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_1
c     b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨  b^{12, 44}_0
c  in DIMACS:
 11831 -11832  11833  516 -11834 0
 11831 -11832  11833  516 -11835 0
 11831 -11832  11833  516  11836 0

c  1-1 --> 0
c    (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0 ∧ -p_516) -> (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧ -b^{12, 44}_0)
c  in CNF:
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_2
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_1
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_0
c  in DIMACS:
 11831  11832 -11833  516 -11834 0
 11831  11832 -11833  516 -11835 0
 11831  11832 -11833  516 -11836 0

c  0-1 --> -1
c    (-b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧ -p_516) -> ( b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0)
c  in CNF:
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨  b^{12, 44}_2
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_1
c     b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨  b^{12, 44}_0
c  in DIMACS:
 11831  11832  11833  516  11834 0
 11831  11832  11833  516 -11835 0
 11831  11832  11833  516  11836 0

c  -1-1 --> -2
c    ( b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧  b^{12, 43}_0 ∧ -p_516) -> ( b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0)
c  in CNF:
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨  b^{12, 44}_2
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨  b^{12, 44}_1
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨  p_516 ∨ -b^{12, 44}_0
c  in DIMACS:
-11831  11832 -11833  516  11834 0
-11831  11832 -11833  516  11835 0
-11831  11832 -11833  516 -11836 0

c  -2-1 --> break 
c    ( b^{12, 43}_2 ∧  b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨  b^{12, 43}_0 ∨  p_516 ∨ break
c  in DIMACS:
-11831 -11832  11833  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 43}_2 ∧ -b^{12, 43}_1 ∧ -b^{12, 43}_0 ∧ true) 
c  in CNF:
c    -b^{12, 43}_2 ∨  b^{12, 43}_1 ∨  b^{12, 43}_0 ∨ false 
c  in DIMACS:
-11831  11832  11833  0

c  3 does not represent an automaton state.
c    -(-b^{12, 43}_2 ∧  b^{12, 43}_1 ∧  b^{12, 43}_0 ∧ true) 
c  in CNF:
c     b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ false 
c  in DIMACS:
 11831 -11832 -11833  0
c  -3 does not represent an automaton state.
c    -( b^{12, 43}_2 ∧  b^{12, 43}_1 ∧  b^{12, 43}_0 ∧ true) 
c  in CNF:
c    -b^{12, 43}_2 ∨ -b^{12, 43}_1 ∨ -b^{12, 43}_0 ∨ false 
c  in DIMACS:
-11831 -11832 -11833  0

c i = 44
c  -2+1 --> -1
c    ( b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧  p_528) -> ( b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0)
c  in CNF:
c    -b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨  b^{12, 45}_2
c    -b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_1
c    -b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨  b^{12, 45}_0
c  in DIMACS:
-11834 -11835  11836 -528  11837 0
-11834 -11835  11836 -528 -11838 0
-11834 -11835  11836 -528  11839 0

c  -1+1 --> 0
c    ( b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0 ∧  p_528) -> (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧ -b^{12, 45}_0)
c  in CNF:
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_2
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_1
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_0
c  in DIMACS:
-11834  11835 -11836 -528 -11837 0
-11834  11835 -11836 -528 -11838 0
-11834  11835 -11836 -528 -11839 0

c  0+1 --> 1
c    (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧  p_528) -> (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0)
c  in CNF:
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_2
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_1
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨  b^{12, 45}_0
c  in DIMACS:
 11834  11835  11836 -528 -11837 0
 11834  11835  11836 -528 -11838 0
 11834  11835  11836 -528  11839 0

c  1+1 --> 2
c    (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0 ∧  p_528) -> (-b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0)
c  in CNF:
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_2
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨  b^{12, 45}_1
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ -p_528 ∨ -b^{12, 45}_0
c  in DIMACS:
 11834  11835 -11836 -528 -11837 0
 11834  11835 -11836 -528  11838 0
 11834  11835 -11836 -528 -11839 0

c  2+1 --> break 
c    (-b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧  p_528) -> break
c  in CNF:
c     b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 11834 -11835  11836 -528 1162 0


c  2-1 --> 1
c    (-b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧ -p_528) -> (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0)
c  in CNF:
c     b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_2
c     b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_1
c     b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨  b^{12, 45}_0
c  in DIMACS:
 11834 -11835  11836  528 -11837 0
 11834 -11835  11836  528 -11838 0
 11834 -11835  11836  528  11839 0

c  1-1 --> 0
c    (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0 ∧ -p_528) -> (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧ -b^{12, 45}_0)
c  in CNF:
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_2
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_1
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_0
c  in DIMACS:
 11834  11835 -11836  528 -11837 0
 11834  11835 -11836  528 -11838 0
 11834  11835 -11836  528 -11839 0

c  0-1 --> -1
c    (-b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧ -p_528) -> ( b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0)
c  in CNF:
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨  b^{12, 45}_2
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_1
c     b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨  b^{12, 45}_0
c  in DIMACS:
 11834  11835  11836  528  11837 0
 11834  11835  11836  528 -11838 0
 11834  11835  11836  528  11839 0

c  -1-1 --> -2
c    ( b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧  b^{12, 44}_0 ∧ -p_528) -> ( b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0)
c  in CNF:
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨  b^{12, 45}_2
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨  b^{12, 45}_1
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨  p_528 ∨ -b^{12, 45}_0
c  in DIMACS:
-11834  11835 -11836  528  11837 0
-11834  11835 -11836  528  11838 0
-11834  11835 -11836  528 -11839 0

c  -2-1 --> break 
c    ( b^{12, 44}_2 ∧  b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨  b^{12, 44}_0 ∨  p_528 ∨ break
c  in DIMACS:
-11834 -11835  11836  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 44}_2 ∧ -b^{12, 44}_1 ∧ -b^{12, 44}_0 ∧ true) 
c  in CNF:
c    -b^{12, 44}_2 ∨  b^{12, 44}_1 ∨  b^{12, 44}_0 ∨ false 
c  in DIMACS:
-11834  11835  11836  0

c  3 does not represent an automaton state.
c    -(-b^{12, 44}_2 ∧  b^{12, 44}_1 ∧  b^{12, 44}_0 ∧ true) 
c  in CNF:
c     b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ false 
c  in DIMACS:
 11834 -11835 -11836  0
c  -3 does not represent an automaton state.
c    -( b^{12, 44}_2 ∧  b^{12, 44}_1 ∧  b^{12, 44}_0 ∧ true) 
c  in CNF:
c    -b^{12, 44}_2 ∨ -b^{12, 44}_1 ∨ -b^{12, 44}_0 ∨ false 
c  in DIMACS:
-11834 -11835 -11836  0

c i = 45
c  -2+1 --> -1
c    ( b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧  p_540) -> ( b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0)
c  in CNF:
c    -b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨  b^{12, 46}_2
c    -b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_1
c    -b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨  b^{12, 46}_0
c  in DIMACS:
-11837 -11838  11839 -540  11840 0
-11837 -11838  11839 -540 -11841 0
-11837 -11838  11839 -540  11842 0

c  -1+1 --> 0
c    ( b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0 ∧  p_540) -> (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧ -b^{12, 46}_0)
c  in CNF:
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_2
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_1
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_0
c  in DIMACS:
-11837  11838 -11839 -540 -11840 0
-11837  11838 -11839 -540 -11841 0
-11837  11838 -11839 -540 -11842 0

c  0+1 --> 1
c    (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧  p_540) -> (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0)
c  in CNF:
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_2
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_1
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨  b^{12, 46}_0
c  in DIMACS:
 11837  11838  11839 -540 -11840 0
 11837  11838  11839 -540 -11841 0
 11837  11838  11839 -540  11842 0

c  1+1 --> 2
c    (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0 ∧  p_540) -> (-b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0)
c  in CNF:
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_2
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨  b^{12, 46}_1
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ -p_540 ∨ -b^{12, 46}_0
c  in DIMACS:
 11837  11838 -11839 -540 -11840 0
 11837  11838 -11839 -540  11841 0
 11837  11838 -11839 -540 -11842 0

c  2+1 --> break 
c    (-b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧  p_540) -> break
c  in CNF:
c     b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 11837 -11838  11839 -540 1162 0


c  2-1 --> 1
c    (-b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧ -p_540) -> (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0)
c  in CNF:
c     b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_2
c     b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_1
c     b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨  b^{12, 46}_0
c  in DIMACS:
 11837 -11838  11839  540 -11840 0
 11837 -11838  11839  540 -11841 0
 11837 -11838  11839  540  11842 0

c  1-1 --> 0
c    (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0 ∧ -p_540) -> (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧ -b^{12, 46}_0)
c  in CNF:
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_2
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_1
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_0
c  in DIMACS:
 11837  11838 -11839  540 -11840 0
 11837  11838 -11839  540 -11841 0
 11837  11838 -11839  540 -11842 0

c  0-1 --> -1
c    (-b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧ -p_540) -> ( b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0)
c  in CNF:
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨  b^{12, 46}_2
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_1
c     b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨  b^{12, 46}_0
c  in DIMACS:
 11837  11838  11839  540  11840 0
 11837  11838  11839  540 -11841 0
 11837  11838  11839  540  11842 0

c  -1-1 --> -2
c    ( b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧  b^{12, 45}_0 ∧ -p_540) -> ( b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0)
c  in CNF:
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨  b^{12, 46}_2
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨  b^{12, 46}_1
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨  p_540 ∨ -b^{12, 46}_0
c  in DIMACS:
-11837  11838 -11839  540  11840 0
-11837  11838 -11839  540  11841 0
-11837  11838 -11839  540 -11842 0

c  -2-1 --> break 
c    ( b^{12, 45}_2 ∧  b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨  b^{12, 45}_0 ∨  p_540 ∨ break
c  in DIMACS:
-11837 -11838  11839  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 45}_2 ∧ -b^{12, 45}_1 ∧ -b^{12, 45}_0 ∧ true) 
c  in CNF:
c    -b^{12, 45}_2 ∨  b^{12, 45}_1 ∨  b^{12, 45}_0 ∨ false 
c  in DIMACS:
-11837  11838  11839  0

c  3 does not represent an automaton state.
c    -(-b^{12, 45}_2 ∧  b^{12, 45}_1 ∧  b^{12, 45}_0 ∧ true) 
c  in CNF:
c     b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ false 
c  in DIMACS:
 11837 -11838 -11839  0
c  -3 does not represent an automaton state.
c    -( b^{12, 45}_2 ∧  b^{12, 45}_1 ∧  b^{12, 45}_0 ∧ true) 
c  in CNF:
c    -b^{12, 45}_2 ∨ -b^{12, 45}_1 ∨ -b^{12, 45}_0 ∨ false 
c  in DIMACS:
-11837 -11838 -11839  0

c i = 46
c  -2+1 --> -1
c    ( b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧  p_552) -> ( b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0)
c  in CNF:
c    -b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨  b^{12, 47}_2
c    -b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_1
c    -b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨  b^{12, 47}_0
c  in DIMACS:
-11840 -11841  11842 -552  11843 0
-11840 -11841  11842 -552 -11844 0
-11840 -11841  11842 -552  11845 0

c  -1+1 --> 0
c    ( b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0 ∧  p_552) -> (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧ -b^{12, 47}_0)
c  in CNF:
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_2
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_1
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_0
c  in DIMACS:
-11840  11841 -11842 -552 -11843 0
-11840  11841 -11842 -552 -11844 0
-11840  11841 -11842 -552 -11845 0

c  0+1 --> 1
c    (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧  p_552) -> (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0)
c  in CNF:
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_2
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_1
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨  b^{12, 47}_0
c  in DIMACS:
 11840  11841  11842 -552 -11843 0
 11840  11841  11842 -552 -11844 0
 11840  11841  11842 -552  11845 0

c  1+1 --> 2
c    (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0 ∧  p_552) -> (-b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0)
c  in CNF:
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_2
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨  b^{12, 47}_1
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ -p_552 ∨ -b^{12, 47}_0
c  in DIMACS:
 11840  11841 -11842 -552 -11843 0
 11840  11841 -11842 -552  11844 0
 11840  11841 -11842 -552 -11845 0

c  2+1 --> break 
c    (-b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧  p_552) -> break
c  in CNF:
c     b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 11840 -11841  11842 -552 1162 0


c  2-1 --> 1
c    (-b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧ -p_552) -> (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0)
c  in CNF:
c     b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_2
c     b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_1
c     b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨  b^{12, 47}_0
c  in DIMACS:
 11840 -11841  11842  552 -11843 0
 11840 -11841  11842  552 -11844 0
 11840 -11841  11842  552  11845 0

c  1-1 --> 0
c    (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0 ∧ -p_552) -> (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧ -b^{12, 47}_0)
c  in CNF:
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_2
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_1
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_0
c  in DIMACS:
 11840  11841 -11842  552 -11843 0
 11840  11841 -11842  552 -11844 0
 11840  11841 -11842  552 -11845 0

c  0-1 --> -1
c    (-b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧ -p_552) -> ( b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0)
c  in CNF:
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨  b^{12, 47}_2
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_1
c     b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨  b^{12, 47}_0
c  in DIMACS:
 11840  11841  11842  552  11843 0
 11840  11841  11842  552 -11844 0
 11840  11841  11842  552  11845 0

c  -1-1 --> -2
c    ( b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧  b^{12, 46}_0 ∧ -p_552) -> ( b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0)
c  in CNF:
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨  b^{12, 47}_2
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨  b^{12, 47}_1
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨  p_552 ∨ -b^{12, 47}_0
c  in DIMACS:
-11840  11841 -11842  552  11843 0
-11840  11841 -11842  552  11844 0
-11840  11841 -11842  552 -11845 0

c  -2-1 --> break 
c    ( b^{12, 46}_2 ∧  b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨  b^{12, 46}_0 ∨  p_552 ∨ break
c  in DIMACS:
-11840 -11841  11842  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 46}_2 ∧ -b^{12, 46}_1 ∧ -b^{12, 46}_0 ∧ true) 
c  in CNF:
c    -b^{12, 46}_2 ∨  b^{12, 46}_1 ∨  b^{12, 46}_0 ∨ false 
c  in DIMACS:
-11840  11841  11842  0

c  3 does not represent an automaton state.
c    -(-b^{12, 46}_2 ∧  b^{12, 46}_1 ∧  b^{12, 46}_0 ∧ true) 
c  in CNF:
c     b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ false 
c  in DIMACS:
 11840 -11841 -11842  0
c  -3 does not represent an automaton state.
c    -( b^{12, 46}_2 ∧  b^{12, 46}_1 ∧  b^{12, 46}_0 ∧ true) 
c  in CNF:
c    -b^{12, 46}_2 ∨ -b^{12, 46}_1 ∨ -b^{12, 46}_0 ∨ false 
c  in DIMACS:
-11840 -11841 -11842  0

c i = 47
c  -2+1 --> -1
c    ( b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧  p_564) -> ( b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0)
c  in CNF:
c    -b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨  b^{12, 48}_2
c    -b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_1
c    -b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨  b^{12, 48}_0
c  in DIMACS:
-11843 -11844  11845 -564  11846 0
-11843 -11844  11845 -564 -11847 0
-11843 -11844  11845 -564  11848 0

c  -1+1 --> 0
c    ( b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0 ∧  p_564) -> (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧ -b^{12, 48}_0)
c  in CNF:
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_2
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_1
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_0
c  in DIMACS:
-11843  11844 -11845 -564 -11846 0
-11843  11844 -11845 -564 -11847 0
-11843  11844 -11845 -564 -11848 0

c  0+1 --> 1
c    (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧  p_564) -> (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0)
c  in CNF:
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_2
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_1
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨  b^{12, 48}_0
c  in DIMACS:
 11843  11844  11845 -564 -11846 0
 11843  11844  11845 -564 -11847 0
 11843  11844  11845 -564  11848 0

c  1+1 --> 2
c    (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0 ∧  p_564) -> (-b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0)
c  in CNF:
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_2
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨  b^{12, 48}_1
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ -p_564 ∨ -b^{12, 48}_0
c  in DIMACS:
 11843  11844 -11845 -564 -11846 0
 11843  11844 -11845 -564  11847 0
 11843  11844 -11845 -564 -11848 0

c  2+1 --> break 
c    (-b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧  p_564) -> break
c  in CNF:
c     b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 11843 -11844  11845 -564 1162 0


c  2-1 --> 1
c    (-b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧ -p_564) -> (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0)
c  in CNF:
c     b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_2
c     b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_1
c     b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨  b^{12, 48}_0
c  in DIMACS:
 11843 -11844  11845  564 -11846 0
 11843 -11844  11845  564 -11847 0
 11843 -11844  11845  564  11848 0

c  1-1 --> 0
c    (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0 ∧ -p_564) -> (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧ -b^{12, 48}_0)
c  in CNF:
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_2
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_1
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_0
c  in DIMACS:
 11843  11844 -11845  564 -11846 0
 11843  11844 -11845  564 -11847 0
 11843  11844 -11845  564 -11848 0

c  0-1 --> -1
c    (-b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧ -p_564) -> ( b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0)
c  in CNF:
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨  b^{12, 48}_2
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_1
c     b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨  b^{12, 48}_0
c  in DIMACS:
 11843  11844  11845  564  11846 0
 11843  11844  11845  564 -11847 0
 11843  11844  11845  564  11848 0

c  -1-1 --> -2
c    ( b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧  b^{12, 47}_0 ∧ -p_564) -> ( b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0)
c  in CNF:
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨  b^{12, 48}_2
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨  b^{12, 48}_1
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨  p_564 ∨ -b^{12, 48}_0
c  in DIMACS:
-11843  11844 -11845  564  11846 0
-11843  11844 -11845  564  11847 0
-11843  11844 -11845  564 -11848 0

c  -2-1 --> break 
c    ( b^{12, 47}_2 ∧  b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨  b^{12, 47}_0 ∨  p_564 ∨ break
c  in DIMACS:
-11843 -11844  11845  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 47}_2 ∧ -b^{12, 47}_1 ∧ -b^{12, 47}_0 ∧ true) 
c  in CNF:
c    -b^{12, 47}_2 ∨  b^{12, 47}_1 ∨  b^{12, 47}_0 ∨ false 
c  in DIMACS:
-11843  11844  11845  0

c  3 does not represent an automaton state.
c    -(-b^{12, 47}_2 ∧  b^{12, 47}_1 ∧  b^{12, 47}_0 ∧ true) 
c  in CNF:
c     b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ false 
c  in DIMACS:
 11843 -11844 -11845  0
c  -3 does not represent an automaton state.
c    -( b^{12, 47}_2 ∧  b^{12, 47}_1 ∧  b^{12, 47}_0 ∧ true) 
c  in CNF:
c    -b^{12, 47}_2 ∨ -b^{12, 47}_1 ∨ -b^{12, 47}_0 ∨ false 
c  in DIMACS:
-11843 -11844 -11845  0

c i = 48
c  -2+1 --> -1
c    ( b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧  p_576) -> ( b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0)
c  in CNF:
c    -b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨  b^{12, 49}_2
c    -b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_1
c    -b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨  b^{12, 49}_0
c  in DIMACS:
-11846 -11847  11848 -576  11849 0
-11846 -11847  11848 -576 -11850 0
-11846 -11847  11848 -576  11851 0

c  -1+1 --> 0
c    ( b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0 ∧  p_576) -> (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧ -b^{12, 49}_0)
c  in CNF:
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_2
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_1
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_0
c  in DIMACS:
-11846  11847 -11848 -576 -11849 0
-11846  11847 -11848 -576 -11850 0
-11846  11847 -11848 -576 -11851 0

c  0+1 --> 1
c    (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧  p_576) -> (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0)
c  in CNF:
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_2
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_1
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨  b^{12, 49}_0
c  in DIMACS:
 11846  11847  11848 -576 -11849 0
 11846  11847  11848 -576 -11850 0
 11846  11847  11848 -576  11851 0

c  1+1 --> 2
c    (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0 ∧  p_576) -> (-b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0)
c  in CNF:
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_2
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨  b^{12, 49}_1
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ -p_576 ∨ -b^{12, 49}_0
c  in DIMACS:
 11846  11847 -11848 -576 -11849 0
 11846  11847 -11848 -576  11850 0
 11846  11847 -11848 -576 -11851 0

c  2+1 --> break 
c    (-b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧  p_576) -> break
c  in CNF:
c     b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 11846 -11847  11848 -576 1162 0


c  2-1 --> 1
c    (-b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧ -p_576) -> (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0)
c  in CNF:
c     b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_2
c     b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_1
c     b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨  b^{12, 49}_0
c  in DIMACS:
 11846 -11847  11848  576 -11849 0
 11846 -11847  11848  576 -11850 0
 11846 -11847  11848  576  11851 0

c  1-1 --> 0
c    (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0 ∧ -p_576) -> (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧ -b^{12, 49}_0)
c  in CNF:
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_2
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_1
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_0
c  in DIMACS:
 11846  11847 -11848  576 -11849 0
 11846  11847 -11848  576 -11850 0
 11846  11847 -11848  576 -11851 0

c  0-1 --> -1
c    (-b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧ -p_576) -> ( b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0)
c  in CNF:
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨  b^{12, 49}_2
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_1
c     b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨  b^{12, 49}_0
c  in DIMACS:
 11846  11847  11848  576  11849 0
 11846  11847  11848  576 -11850 0
 11846  11847  11848  576  11851 0

c  -1-1 --> -2
c    ( b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧  b^{12, 48}_0 ∧ -p_576) -> ( b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0)
c  in CNF:
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨  b^{12, 49}_2
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨  b^{12, 49}_1
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨  p_576 ∨ -b^{12, 49}_0
c  in DIMACS:
-11846  11847 -11848  576  11849 0
-11846  11847 -11848  576  11850 0
-11846  11847 -11848  576 -11851 0

c  -2-1 --> break 
c    ( b^{12, 48}_2 ∧  b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨  b^{12, 48}_0 ∨  p_576 ∨ break
c  in DIMACS:
-11846 -11847  11848  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 48}_2 ∧ -b^{12, 48}_1 ∧ -b^{12, 48}_0 ∧ true) 
c  in CNF:
c    -b^{12, 48}_2 ∨  b^{12, 48}_1 ∨  b^{12, 48}_0 ∨ false 
c  in DIMACS:
-11846  11847  11848  0

c  3 does not represent an automaton state.
c    -(-b^{12, 48}_2 ∧  b^{12, 48}_1 ∧  b^{12, 48}_0 ∧ true) 
c  in CNF:
c     b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ false 
c  in DIMACS:
 11846 -11847 -11848  0
c  -3 does not represent an automaton state.
c    -( b^{12, 48}_2 ∧  b^{12, 48}_1 ∧  b^{12, 48}_0 ∧ true) 
c  in CNF:
c    -b^{12, 48}_2 ∨ -b^{12, 48}_1 ∨ -b^{12, 48}_0 ∨ false 
c  in DIMACS:
-11846 -11847 -11848  0

c i = 49
c  -2+1 --> -1
c    ( b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧  p_588) -> ( b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0)
c  in CNF:
c    -b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨  b^{12, 50}_2
c    -b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_1
c    -b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨  b^{12, 50}_0
c  in DIMACS:
-11849 -11850  11851 -588  11852 0
-11849 -11850  11851 -588 -11853 0
-11849 -11850  11851 -588  11854 0

c  -1+1 --> 0
c    ( b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0 ∧  p_588) -> (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧ -b^{12, 50}_0)
c  in CNF:
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_2
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_1
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_0
c  in DIMACS:
-11849  11850 -11851 -588 -11852 0
-11849  11850 -11851 -588 -11853 0
-11849  11850 -11851 -588 -11854 0

c  0+1 --> 1
c    (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧  p_588) -> (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0)
c  in CNF:
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_2
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_1
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨  b^{12, 50}_0
c  in DIMACS:
 11849  11850  11851 -588 -11852 0
 11849  11850  11851 -588 -11853 0
 11849  11850  11851 -588  11854 0

c  1+1 --> 2
c    (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0 ∧  p_588) -> (-b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0)
c  in CNF:
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_2
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨  b^{12, 50}_1
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ -p_588 ∨ -b^{12, 50}_0
c  in DIMACS:
 11849  11850 -11851 -588 -11852 0
 11849  11850 -11851 -588  11853 0
 11849  11850 -11851 -588 -11854 0

c  2+1 --> break 
c    (-b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧  p_588) -> break
c  in CNF:
c     b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 11849 -11850  11851 -588 1162 0


c  2-1 --> 1
c    (-b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧ -p_588) -> (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0)
c  in CNF:
c     b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_2
c     b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_1
c     b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨  b^{12, 50}_0
c  in DIMACS:
 11849 -11850  11851  588 -11852 0
 11849 -11850  11851  588 -11853 0
 11849 -11850  11851  588  11854 0

c  1-1 --> 0
c    (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0 ∧ -p_588) -> (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧ -b^{12, 50}_0)
c  in CNF:
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_2
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_1
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_0
c  in DIMACS:
 11849  11850 -11851  588 -11852 0
 11849  11850 -11851  588 -11853 0
 11849  11850 -11851  588 -11854 0

c  0-1 --> -1
c    (-b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧ -p_588) -> ( b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0)
c  in CNF:
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨  b^{12, 50}_2
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_1
c     b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨  b^{12, 50}_0
c  in DIMACS:
 11849  11850  11851  588  11852 0
 11849  11850  11851  588 -11853 0
 11849  11850  11851  588  11854 0

c  -1-1 --> -2
c    ( b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧  b^{12, 49}_0 ∧ -p_588) -> ( b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0)
c  in CNF:
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨  b^{12, 50}_2
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨  b^{12, 50}_1
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨  p_588 ∨ -b^{12, 50}_0
c  in DIMACS:
-11849  11850 -11851  588  11852 0
-11849  11850 -11851  588  11853 0
-11849  11850 -11851  588 -11854 0

c  -2-1 --> break 
c    ( b^{12, 49}_2 ∧  b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨  b^{12, 49}_0 ∨  p_588 ∨ break
c  in DIMACS:
-11849 -11850  11851  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 49}_2 ∧ -b^{12, 49}_1 ∧ -b^{12, 49}_0 ∧ true) 
c  in CNF:
c    -b^{12, 49}_2 ∨  b^{12, 49}_1 ∨  b^{12, 49}_0 ∨ false 
c  in DIMACS:
-11849  11850  11851  0

c  3 does not represent an automaton state.
c    -(-b^{12, 49}_2 ∧  b^{12, 49}_1 ∧  b^{12, 49}_0 ∧ true) 
c  in CNF:
c     b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ false 
c  in DIMACS:
 11849 -11850 -11851  0
c  -3 does not represent an automaton state.
c    -( b^{12, 49}_2 ∧  b^{12, 49}_1 ∧  b^{12, 49}_0 ∧ true) 
c  in CNF:
c    -b^{12, 49}_2 ∨ -b^{12, 49}_1 ∨ -b^{12, 49}_0 ∨ false 
c  in DIMACS:
-11849 -11850 -11851  0

c i = 50
c  -2+1 --> -1
c    ( b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧  p_600) -> ( b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0)
c  in CNF:
c    -b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨  b^{12, 51}_2
c    -b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_1
c    -b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨  b^{12, 51}_0
c  in DIMACS:
-11852 -11853  11854 -600  11855 0
-11852 -11853  11854 -600 -11856 0
-11852 -11853  11854 -600  11857 0

c  -1+1 --> 0
c    ( b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0 ∧  p_600) -> (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧ -b^{12, 51}_0)
c  in CNF:
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_2
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_1
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_0
c  in DIMACS:
-11852  11853 -11854 -600 -11855 0
-11852  11853 -11854 -600 -11856 0
-11852  11853 -11854 -600 -11857 0

c  0+1 --> 1
c    (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧  p_600) -> (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0)
c  in CNF:
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_2
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_1
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨  b^{12, 51}_0
c  in DIMACS:
 11852  11853  11854 -600 -11855 0
 11852  11853  11854 -600 -11856 0
 11852  11853  11854 -600  11857 0

c  1+1 --> 2
c    (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0 ∧  p_600) -> (-b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0)
c  in CNF:
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_2
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨  b^{12, 51}_1
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ -p_600 ∨ -b^{12, 51}_0
c  in DIMACS:
 11852  11853 -11854 -600 -11855 0
 11852  11853 -11854 -600  11856 0
 11852  11853 -11854 -600 -11857 0

c  2+1 --> break 
c    (-b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧  p_600) -> break
c  in CNF:
c     b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 11852 -11853  11854 -600 1162 0


c  2-1 --> 1
c    (-b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧ -p_600) -> (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0)
c  in CNF:
c     b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_2
c     b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_1
c     b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨  b^{12, 51}_0
c  in DIMACS:
 11852 -11853  11854  600 -11855 0
 11852 -11853  11854  600 -11856 0
 11852 -11853  11854  600  11857 0

c  1-1 --> 0
c    (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0 ∧ -p_600) -> (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧ -b^{12, 51}_0)
c  in CNF:
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_2
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_1
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_0
c  in DIMACS:
 11852  11853 -11854  600 -11855 0
 11852  11853 -11854  600 -11856 0
 11852  11853 -11854  600 -11857 0

c  0-1 --> -1
c    (-b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧ -p_600) -> ( b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0)
c  in CNF:
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨  b^{12, 51}_2
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_1
c     b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨  b^{12, 51}_0
c  in DIMACS:
 11852  11853  11854  600  11855 0
 11852  11853  11854  600 -11856 0
 11852  11853  11854  600  11857 0

c  -1-1 --> -2
c    ( b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧  b^{12, 50}_0 ∧ -p_600) -> ( b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0)
c  in CNF:
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨  b^{12, 51}_2
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨  b^{12, 51}_1
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨  p_600 ∨ -b^{12, 51}_0
c  in DIMACS:
-11852  11853 -11854  600  11855 0
-11852  11853 -11854  600  11856 0
-11852  11853 -11854  600 -11857 0

c  -2-1 --> break 
c    ( b^{12, 50}_2 ∧  b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨  b^{12, 50}_0 ∨  p_600 ∨ break
c  in DIMACS:
-11852 -11853  11854  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 50}_2 ∧ -b^{12, 50}_1 ∧ -b^{12, 50}_0 ∧ true) 
c  in CNF:
c    -b^{12, 50}_2 ∨  b^{12, 50}_1 ∨  b^{12, 50}_0 ∨ false 
c  in DIMACS:
-11852  11853  11854  0

c  3 does not represent an automaton state.
c    -(-b^{12, 50}_2 ∧  b^{12, 50}_1 ∧  b^{12, 50}_0 ∧ true) 
c  in CNF:
c     b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ false 
c  in DIMACS:
 11852 -11853 -11854  0
c  -3 does not represent an automaton state.
c    -( b^{12, 50}_2 ∧  b^{12, 50}_1 ∧  b^{12, 50}_0 ∧ true) 
c  in CNF:
c    -b^{12, 50}_2 ∨ -b^{12, 50}_1 ∨ -b^{12, 50}_0 ∨ false 
c  in DIMACS:
-11852 -11853 -11854  0

c i = 51
c  -2+1 --> -1
c    ( b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧  p_612) -> ( b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0)
c  in CNF:
c    -b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨  b^{12, 52}_2
c    -b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_1
c    -b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨  b^{12, 52}_0
c  in DIMACS:
-11855 -11856  11857 -612  11858 0
-11855 -11856  11857 -612 -11859 0
-11855 -11856  11857 -612  11860 0

c  -1+1 --> 0
c    ( b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0 ∧  p_612) -> (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧ -b^{12, 52}_0)
c  in CNF:
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_2
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_1
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_0
c  in DIMACS:
-11855  11856 -11857 -612 -11858 0
-11855  11856 -11857 -612 -11859 0
-11855  11856 -11857 -612 -11860 0

c  0+1 --> 1
c    (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧  p_612) -> (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0)
c  in CNF:
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_2
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_1
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨  b^{12, 52}_0
c  in DIMACS:
 11855  11856  11857 -612 -11858 0
 11855  11856  11857 -612 -11859 0
 11855  11856  11857 -612  11860 0

c  1+1 --> 2
c    (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0 ∧  p_612) -> (-b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0)
c  in CNF:
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_2
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨  b^{12, 52}_1
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ -p_612 ∨ -b^{12, 52}_0
c  in DIMACS:
 11855  11856 -11857 -612 -11858 0
 11855  11856 -11857 -612  11859 0
 11855  11856 -11857 -612 -11860 0

c  2+1 --> break 
c    (-b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧  p_612) -> break
c  in CNF:
c     b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 11855 -11856  11857 -612 1162 0


c  2-1 --> 1
c    (-b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧ -p_612) -> (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0)
c  in CNF:
c     b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_2
c     b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_1
c     b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨  b^{12, 52}_0
c  in DIMACS:
 11855 -11856  11857  612 -11858 0
 11855 -11856  11857  612 -11859 0
 11855 -11856  11857  612  11860 0

c  1-1 --> 0
c    (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0 ∧ -p_612) -> (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧ -b^{12, 52}_0)
c  in CNF:
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_2
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_1
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_0
c  in DIMACS:
 11855  11856 -11857  612 -11858 0
 11855  11856 -11857  612 -11859 0
 11855  11856 -11857  612 -11860 0

c  0-1 --> -1
c    (-b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧ -p_612) -> ( b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0)
c  in CNF:
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨  b^{12, 52}_2
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_1
c     b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨  b^{12, 52}_0
c  in DIMACS:
 11855  11856  11857  612  11858 0
 11855  11856  11857  612 -11859 0
 11855  11856  11857  612  11860 0

c  -1-1 --> -2
c    ( b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧  b^{12, 51}_0 ∧ -p_612) -> ( b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0)
c  in CNF:
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨  b^{12, 52}_2
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨  b^{12, 52}_1
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨  p_612 ∨ -b^{12, 52}_0
c  in DIMACS:
-11855  11856 -11857  612  11858 0
-11855  11856 -11857  612  11859 0
-11855  11856 -11857  612 -11860 0

c  -2-1 --> break 
c    ( b^{12, 51}_2 ∧  b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨  b^{12, 51}_0 ∨  p_612 ∨ break
c  in DIMACS:
-11855 -11856  11857  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 51}_2 ∧ -b^{12, 51}_1 ∧ -b^{12, 51}_0 ∧ true) 
c  in CNF:
c    -b^{12, 51}_2 ∨  b^{12, 51}_1 ∨  b^{12, 51}_0 ∨ false 
c  in DIMACS:
-11855  11856  11857  0

c  3 does not represent an automaton state.
c    -(-b^{12, 51}_2 ∧  b^{12, 51}_1 ∧  b^{12, 51}_0 ∧ true) 
c  in CNF:
c     b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ false 
c  in DIMACS:
 11855 -11856 -11857  0
c  -3 does not represent an automaton state.
c    -( b^{12, 51}_2 ∧  b^{12, 51}_1 ∧  b^{12, 51}_0 ∧ true) 
c  in CNF:
c    -b^{12, 51}_2 ∨ -b^{12, 51}_1 ∨ -b^{12, 51}_0 ∨ false 
c  in DIMACS:
-11855 -11856 -11857  0

c i = 52
c  -2+1 --> -1
c    ( b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧  p_624) -> ( b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0)
c  in CNF:
c    -b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨  b^{12, 53}_2
c    -b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_1
c    -b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨  b^{12, 53}_0
c  in DIMACS:
-11858 -11859  11860 -624  11861 0
-11858 -11859  11860 -624 -11862 0
-11858 -11859  11860 -624  11863 0

c  -1+1 --> 0
c    ( b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0 ∧  p_624) -> (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧ -b^{12, 53}_0)
c  in CNF:
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_2
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_1
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_0
c  in DIMACS:
-11858  11859 -11860 -624 -11861 0
-11858  11859 -11860 -624 -11862 0
-11858  11859 -11860 -624 -11863 0

c  0+1 --> 1
c    (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧  p_624) -> (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0)
c  in CNF:
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_2
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_1
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨  b^{12, 53}_0
c  in DIMACS:
 11858  11859  11860 -624 -11861 0
 11858  11859  11860 -624 -11862 0
 11858  11859  11860 -624  11863 0

c  1+1 --> 2
c    (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0 ∧  p_624) -> (-b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0)
c  in CNF:
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_2
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨  b^{12, 53}_1
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ -p_624 ∨ -b^{12, 53}_0
c  in DIMACS:
 11858  11859 -11860 -624 -11861 0
 11858  11859 -11860 -624  11862 0
 11858  11859 -11860 -624 -11863 0

c  2+1 --> break 
c    (-b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧  p_624) -> break
c  in CNF:
c     b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 11858 -11859  11860 -624 1162 0


c  2-1 --> 1
c    (-b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧ -p_624) -> (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0)
c  in CNF:
c     b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_2
c     b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_1
c     b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨  b^{12, 53}_0
c  in DIMACS:
 11858 -11859  11860  624 -11861 0
 11858 -11859  11860  624 -11862 0
 11858 -11859  11860  624  11863 0

c  1-1 --> 0
c    (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0 ∧ -p_624) -> (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧ -b^{12, 53}_0)
c  in CNF:
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_2
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_1
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_0
c  in DIMACS:
 11858  11859 -11860  624 -11861 0
 11858  11859 -11860  624 -11862 0
 11858  11859 -11860  624 -11863 0

c  0-1 --> -1
c    (-b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧ -p_624) -> ( b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0)
c  in CNF:
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨  b^{12, 53}_2
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_1
c     b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨  b^{12, 53}_0
c  in DIMACS:
 11858  11859  11860  624  11861 0
 11858  11859  11860  624 -11862 0
 11858  11859  11860  624  11863 0

c  -1-1 --> -2
c    ( b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧  b^{12, 52}_0 ∧ -p_624) -> ( b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0)
c  in CNF:
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨  b^{12, 53}_2
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨  b^{12, 53}_1
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨  p_624 ∨ -b^{12, 53}_0
c  in DIMACS:
-11858  11859 -11860  624  11861 0
-11858  11859 -11860  624  11862 0
-11858  11859 -11860  624 -11863 0

c  -2-1 --> break 
c    ( b^{12, 52}_2 ∧  b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨  b^{12, 52}_0 ∨  p_624 ∨ break
c  in DIMACS:
-11858 -11859  11860  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 52}_2 ∧ -b^{12, 52}_1 ∧ -b^{12, 52}_0 ∧ true) 
c  in CNF:
c    -b^{12, 52}_2 ∨  b^{12, 52}_1 ∨  b^{12, 52}_0 ∨ false 
c  in DIMACS:
-11858  11859  11860  0

c  3 does not represent an automaton state.
c    -(-b^{12, 52}_2 ∧  b^{12, 52}_1 ∧  b^{12, 52}_0 ∧ true) 
c  in CNF:
c     b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ false 
c  in DIMACS:
 11858 -11859 -11860  0
c  -3 does not represent an automaton state.
c    -( b^{12, 52}_2 ∧  b^{12, 52}_1 ∧  b^{12, 52}_0 ∧ true) 
c  in CNF:
c    -b^{12, 52}_2 ∨ -b^{12, 52}_1 ∨ -b^{12, 52}_0 ∨ false 
c  in DIMACS:
-11858 -11859 -11860  0

c i = 53
c  -2+1 --> -1
c    ( b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧  p_636) -> ( b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0)
c  in CNF:
c    -b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨  b^{12, 54}_2
c    -b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_1
c    -b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨  b^{12, 54}_0
c  in DIMACS:
-11861 -11862  11863 -636  11864 0
-11861 -11862  11863 -636 -11865 0
-11861 -11862  11863 -636  11866 0

c  -1+1 --> 0
c    ( b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0 ∧  p_636) -> (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧ -b^{12, 54}_0)
c  in CNF:
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_2
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_1
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_0
c  in DIMACS:
-11861  11862 -11863 -636 -11864 0
-11861  11862 -11863 -636 -11865 0
-11861  11862 -11863 -636 -11866 0

c  0+1 --> 1
c    (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧  p_636) -> (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0)
c  in CNF:
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_2
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_1
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨  b^{12, 54}_0
c  in DIMACS:
 11861  11862  11863 -636 -11864 0
 11861  11862  11863 -636 -11865 0
 11861  11862  11863 -636  11866 0

c  1+1 --> 2
c    (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0 ∧  p_636) -> (-b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0)
c  in CNF:
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_2
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨  b^{12, 54}_1
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ -p_636 ∨ -b^{12, 54}_0
c  in DIMACS:
 11861  11862 -11863 -636 -11864 0
 11861  11862 -11863 -636  11865 0
 11861  11862 -11863 -636 -11866 0

c  2+1 --> break 
c    (-b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧  p_636) -> break
c  in CNF:
c     b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 11861 -11862  11863 -636 1162 0


c  2-1 --> 1
c    (-b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧ -p_636) -> (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0)
c  in CNF:
c     b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_2
c     b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_1
c     b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨  b^{12, 54}_0
c  in DIMACS:
 11861 -11862  11863  636 -11864 0
 11861 -11862  11863  636 -11865 0
 11861 -11862  11863  636  11866 0

c  1-1 --> 0
c    (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0 ∧ -p_636) -> (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧ -b^{12, 54}_0)
c  in CNF:
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_2
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_1
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_0
c  in DIMACS:
 11861  11862 -11863  636 -11864 0
 11861  11862 -11863  636 -11865 0
 11861  11862 -11863  636 -11866 0

c  0-1 --> -1
c    (-b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧ -p_636) -> ( b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0)
c  in CNF:
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨  b^{12, 54}_2
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_1
c     b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨  b^{12, 54}_0
c  in DIMACS:
 11861  11862  11863  636  11864 0
 11861  11862  11863  636 -11865 0
 11861  11862  11863  636  11866 0

c  -1-1 --> -2
c    ( b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧  b^{12, 53}_0 ∧ -p_636) -> ( b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0)
c  in CNF:
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨  b^{12, 54}_2
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨  b^{12, 54}_1
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨  p_636 ∨ -b^{12, 54}_0
c  in DIMACS:
-11861  11862 -11863  636  11864 0
-11861  11862 -11863  636  11865 0
-11861  11862 -11863  636 -11866 0

c  -2-1 --> break 
c    ( b^{12, 53}_2 ∧  b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨  b^{12, 53}_0 ∨  p_636 ∨ break
c  in DIMACS:
-11861 -11862  11863  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 53}_2 ∧ -b^{12, 53}_1 ∧ -b^{12, 53}_0 ∧ true) 
c  in CNF:
c    -b^{12, 53}_2 ∨  b^{12, 53}_1 ∨  b^{12, 53}_0 ∨ false 
c  in DIMACS:
-11861  11862  11863  0

c  3 does not represent an automaton state.
c    -(-b^{12, 53}_2 ∧  b^{12, 53}_1 ∧  b^{12, 53}_0 ∧ true) 
c  in CNF:
c     b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ false 
c  in DIMACS:
 11861 -11862 -11863  0
c  -3 does not represent an automaton state.
c    -( b^{12, 53}_2 ∧  b^{12, 53}_1 ∧  b^{12, 53}_0 ∧ true) 
c  in CNF:
c    -b^{12, 53}_2 ∨ -b^{12, 53}_1 ∨ -b^{12, 53}_0 ∨ false 
c  in DIMACS:
-11861 -11862 -11863  0

c i = 54
c  -2+1 --> -1
c    ( b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧  p_648) -> ( b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0)
c  in CNF:
c    -b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨  b^{12, 55}_2
c    -b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_1
c    -b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨  b^{12, 55}_0
c  in DIMACS:
-11864 -11865  11866 -648  11867 0
-11864 -11865  11866 -648 -11868 0
-11864 -11865  11866 -648  11869 0

c  -1+1 --> 0
c    ( b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0 ∧  p_648) -> (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧ -b^{12, 55}_0)
c  in CNF:
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_2
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_1
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_0
c  in DIMACS:
-11864  11865 -11866 -648 -11867 0
-11864  11865 -11866 -648 -11868 0
-11864  11865 -11866 -648 -11869 0

c  0+1 --> 1
c    (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧  p_648) -> (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0)
c  in CNF:
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_2
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_1
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨  b^{12, 55}_0
c  in DIMACS:
 11864  11865  11866 -648 -11867 0
 11864  11865  11866 -648 -11868 0
 11864  11865  11866 -648  11869 0

c  1+1 --> 2
c    (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0 ∧  p_648) -> (-b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0)
c  in CNF:
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_2
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨  b^{12, 55}_1
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ -p_648 ∨ -b^{12, 55}_0
c  in DIMACS:
 11864  11865 -11866 -648 -11867 0
 11864  11865 -11866 -648  11868 0
 11864  11865 -11866 -648 -11869 0

c  2+1 --> break 
c    (-b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧  p_648) -> break
c  in CNF:
c     b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 11864 -11865  11866 -648 1162 0


c  2-1 --> 1
c    (-b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧ -p_648) -> (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0)
c  in CNF:
c     b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_2
c     b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_1
c     b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨  b^{12, 55}_0
c  in DIMACS:
 11864 -11865  11866  648 -11867 0
 11864 -11865  11866  648 -11868 0
 11864 -11865  11866  648  11869 0

c  1-1 --> 0
c    (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0 ∧ -p_648) -> (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧ -b^{12, 55}_0)
c  in CNF:
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_2
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_1
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_0
c  in DIMACS:
 11864  11865 -11866  648 -11867 0
 11864  11865 -11866  648 -11868 0
 11864  11865 -11866  648 -11869 0

c  0-1 --> -1
c    (-b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧ -p_648) -> ( b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0)
c  in CNF:
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨  b^{12, 55}_2
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_1
c     b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨  b^{12, 55}_0
c  in DIMACS:
 11864  11865  11866  648  11867 0
 11864  11865  11866  648 -11868 0
 11864  11865  11866  648  11869 0

c  -1-1 --> -2
c    ( b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧  b^{12, 54}_0 ∧ -p_648) -> ( b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0)
c  in CNF:
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨  b^{12, 55}_2
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨  b^{12, 55}_1
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨  p_648 ∨ -b^{12, 55}_0
c  in DIMACS:
-11864  11865 -11866  648  11867 0
-11864  11865 -11866  648  11868 0
-11864  11865 -11866  648 -11869 0

c  -2-1 --> break 
c    ( b^{12, 54}_2 ∧  b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨  b^{12, 54}_0 ∨  p_648 ∨ break
c  in DIMACS:
-11864 -11865  11866  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 54}_2 ∧ -b^{12, 54}_1 ∧ -b^{12, 54}_0 ∧ true) 
c  in CNF:
c    -b^{12, 54}_2 ∨  b^{12, 54}_1 ∨  b^{12, 54}_0 ∨ false 
c  in DIMACS:
-11864  11865  11866  0

c  3 does not represent an automaton state.
c    -(-b^{12, 54}_2 ∧  b^{12, 54}_1 ∧  b^{12, 54}_0 ∧ true) 
c  in CNF:
c     b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ false 
c  in DIMACS:
 11864 -11865 -11866  0
c  -3 does not represent an automaton state.
c    -( b^{12, 54}_2 ∧  b^{12, 54}_1 ∧  b^{12, 54}_0 ∧ true) 
c  in CNF:
c    -b^{12, 54}_2 ∨ -b^{12, 54}_1 ∨ -b^{12, 54}_0 ∨ false 
c  in DIMACS:
-11864 -11865 -11866  0

c i = 55
c  -2+1 --> -1
c    ( b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧  p_660) -> ( b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0)
c  in CNF:
c    -b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨  b^{12, 56}_2
c    -b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_1
c    -b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨  b^{12, 56}_0
c  in DIMACS:
-11867 -11868  11869 -660  11870 0
-11867 -11868  11869 -660 -11871 0
-11867 -11868  11869 -660  11872 0

c  -1+1 --> 0
c    ( b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0 ∧  p_660) -> (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧ -b^{12, 56}_0)
c  in CNF:
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_2
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_1
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_0
c  in DIMACS:
-11867  11868 -11869 -660 -11870 0
-11867  11868 -11869 -660 -11871 0
-11867  11868 -11869 -660 -11872 0

c  0+1 --> 1
c    (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧  p_660) -> (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0)
c  in CNF:
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_2
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_1
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨  b^{12, 56}_0
c  in DIMACS:
 11867  11868  11869 -660 -11870 0
 11867  11868  11869 -660 -11871 0
 11867  11868  11869 -660  11872 0

c  1+1 --> 2
c    (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0 ∧  p_660) -> (-b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0)
c  in CNF:
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_2
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨  b^{12, 56}_1
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ -p_660 ∨ -b^{12, 56}_0
c  in DIMACS:
 11867  11868 -11869 -660 -11870 0
 11867  11868 -11869 -660  11871 0
 11867  11868 -11869 -660 -11872 0

c  2+1 --> break 
c    (-b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧  p_660) -> break
c  in CNF:
c     b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 11867 -11868  11869 -660 1162 0


c  2-1 --> 1
c    (-b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧ -p_660) -> (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0)
c  in CNF:
c     b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_2
c     b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_1
c     b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨  b^{12, 56}_0
c  in DIMACS:
 11867 -11868  11869  660 -11870 0
 11867 -11868  11869  660 -11871 0
 11867 -11868  11869  660  11872 0

c  1-1 --> 0
c    (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0 ∧ -p_660) -> (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧ -b^{12, 56}_0)
c  in CNF:
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_2
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_1
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_0
c  in DIMACS:
 11867  11868 -11869  660 -11870 0
 11867  11868 -11869  660 -11871 0
 11867  11868 -11869  660 -11872 0

c  0-1 --> -1
c    (-b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧ -p_660) -> ( b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0)
c  in CNF:
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨  b^{12, 56}_2
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_1
c     b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨  b^{12, 56}_0
c  in DIMACS:
 11867  11868  11869  660  11870 0
 11867  11868  11869  660 -11871 0
 11867  11868  11869  660  11872 0

c  -1-1 --> -2
c    ( b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧  b^{12, 55}_0 ∧ -p_660) -> ( b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0)
c  in CNF:
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨  b^{12, 56}_2
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨  b^{12, 56}_1
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨  p_660 ∨ -b^{12, 56}_0
c  in DIMACS:
-11867  11868 -11869  660  11870 0
-11867  11868 -11869  660  11871 0
-11867  11868 -11869  660 -11872 0

c  -2-1 --> break 
c    ( b^{12, 55}_2 ∧  b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨  b^{12, 55}_0 ∨  p_660 ∨ break
c  in DIMACS:
-11867 -11868  11869  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 55}_2 ∧ -b^{12, 55}_1 ∧ -b^{12, 55}_0 ∧ true) 
c  in CNF:
c    -b^{12, 55}_2 ∨  b^{12, 55}_1 ∨  b^{12, 55}_0 ∨ false 
c  in DIMACS:
-11867  11868  11869  0

c  3 does not represent an automaton state.
c    -(-b^{12, 55}_2 ∧  b^{12, 55}_1 ∧  b^{12, 55}_0 ∧ true) 
c  in CNF:
c     b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ false 
c  in DIMACS:
 11867 -11868 -11869  0
c  -3 does not represent an automaton state.
c    -( b^{12, 55}_2 ∧  b^{12, 55}_1 ∧  b^{12, 55}_0 ∧ true) 
c  in CNF:
c    -b^{12, 55}_2 ∨ -b^{12, 55}_1 ∨ -b^{12, 55}_0 ∨ false 
c  in DIMACS:
-11867 -11868 -11869  0

c i = 56
c  -2+1 --> -1
c    ( b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧  p_672) -> ( b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0)
c  in CNF:
c    -b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨  b^{12, 57}_2
c    -b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_1
c    -b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨  b^{12, 57}_0
c  in DIMACS:
-11870 -11871  11872 -672  11873 0
-11870 -11871  11872 -672 -11874 0
-11870 -11871  11872 -672  11875 0

c  -1+1 --> 0
c    ( b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0 ∧  p_672) -> (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧ -b^{12, 57}_0)
c  in CNF:
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_2
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_1
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_0
c  in DIMACS:
-11870  11871 -11872 -672 -11873 0
-11870  11871 -11872 -672 -11874 0
-11870  11871 -11872 -672 -11875 0

c  0+1 --> 1
c    (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧  p_672) -> (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0)
c  in CNF:
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_2
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_1
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨  b^{12, 57}_0
c  in DIMACS:
 11870  11871  11872 -672 -11873 0
 11870  11871  11872 -672 -11874 0
 11870  11871  11872 -672  11875 0

c  1+1 --> 2
c    (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0 ∧  p_672) -> (-b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0)
c  in CNF:
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_2
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨  b^{12, 57}_1
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ -p_672 ∨ -b^{12, 57}_0
c  in DIMACS:
 11870  11871 -11872 -672 -11873 0
 11870  11871 -11872 -672  11874 0
 11870  11871 -11872 -672 -11875 0

c  2+1 --> break 
c    (-b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧  p_672) -> break
c  in CNF:
c     b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 11870 -11871  11872 -672 1162 0


c  2-1 --> 1
c    (-b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧ -p_672) -> (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0)
c  in CNF:
c     b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_2
c     b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_1
c     b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨  b^{12, 57}_0
c  in DIMACS:
 11870 -11871  11872  672 -11873 0
 11870 -11871  11872  672 -11874 0
 11870 -11871  11872  672  11875 0

c  1-1 --> 0
c    (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0 ∧ -p_672) -> (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧ -b^{12, 57}_0)
c  in CNF:
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_2
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_1
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_0
c  in DIMACS:
 11870  11871 -11872  672 -11873 0
 11870  11871 -11872  672 -11874 0
 11870  11871 -11872  672 -11875 0

c  0-1 --> -1
c    (-b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧ -p_672) -> ( b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0)
c  in CNF:
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨  b^{12, 57}_2
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_1
c     b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨  b^{12, 57}_0
c  in DIMACS:
 11870  11871  11872  672  11873 0
 11870  11871  11872  672 -11874 0
 11870  11871  11872  672  11875 0

c  -1-1 --> -2
c    ( b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧  b^{12, 56}_0 ∧ -p_672) -> ( b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0)
c  in CNF:
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨  b^{12, 57}_2
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨  b^{12, 57}_1
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨  p_672 ∨ -b^{12, 57}_0
c  in DIMACS:
-11870  11871 -11872  672  11873 0
-11870  11871 -11872  672  11874 0
-11870  11871 -11872  672 -11875 0

c  -2-1 --> break 
c    ( b^{12, 56}_2 ∧  b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨  b^{12, 56}_0 ∨  p_672 ∨ break
c  in DIMACS:
-11870 -11871  11872  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 56}_2 ∧ -b^{12, 56}_1 ∧ -b^{12, 56}_0 ∧ true) 
c  in CNF:
c    -b^{12, 56}_2 ∨  b^{12, 56}_1 ∨  b^{12, 56}_0 ∨ false 
c  in DIMACS:
-11870  11871  11872  0

c  3 does not represent an automaton state.
c    -(-b^{12, 56}_2 ∧  b^{12, 56}_1 ∧  b^{12, 56}_0 ∧ true) 
c  in CNF:
c     b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ false 
c  in DIMACS:
 11870 -11871 -11872  0
c  -3 does not represent an automaton state.
c    -( b^{12, 56}_2 ∧  b^{12, 56}_1 ∧  b^{12, 56}_0 ∧ true) 
c  in CNF:
c    -b^{12, 56}_2 ∨ -b^{12, 56}_1 ∨ -b^{12, 56}_0 ∨ false 
c  in DIMACS:
-11870 -11871 -11872  0

c i = 57
c  -2+1 --> -1
c    ( b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧  p_684) -> ( b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0)
c  in CNF:
c    -b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨  b^{12, 58}_2
c    -b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_1
c    -b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨  b^{12, 58}_0
c  in DIMACS:
-11873 -11874  11875 -684  11876 0
-11873 -11874  11875 -684 -11877 0
-11873 -11874  11875 -684  11878 0

c  -1+1 --> 0
c    ( b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0 ∧  p_684) -> (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧ -b^{12, 58}_0)
c  in CNF:
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_2
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_1
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_0
c  in DIMACS:
-11873  11874 -11875 -684 -11876 0
-11873  11874 -11875 -684 -11877 0
-11873  11874 -11875 -684 -11878 0

c  0+1 --> 1
c    (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧  p_684) -> (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0)
c  in CNF:
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_2
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_1
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨  b^{12, 58}_0
c  in DIMACS:
 11873  11874  11875 -684 -11876 0
 11873  11874  11875 -684 -11877 0
 11873  11874  11875 -684  11878 0

c  1+1 --> 2
c    (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0 ∧  p_684) -> (-b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0)
c  in CNF:
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_2
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨  b^{12, 58}_1
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ -p_684 ∨ -b^{12, 58}_0
c  in DIMACS:
 11873  11874 -11875 -684 -11876 0
 11873  11874 -11875 -684  11877 0
 11873  11874 -11875 -684 -11878 0

c  2+1 --> break 
c    (-b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧  p_684) -> break
c  in CNF:
c     b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 11873 -11874  11875 -684 1162 0


c  2-1 --> 1
c    (-b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧ -p_684) -> (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0)
c  in CNF:
c     b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_2
c     b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_1
c     b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨  b^{12, 58}_0
c  in DIMACS:
 11873 -11874  11875  684 -11876 0
 11873 -11874  11875  684 -11877 0
 11873 -11874  11875  684  11878 0

c  1-1 --> 0
c    (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0 ∧ -p_684) -> (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧ -b^{12, 58}_0)
c  in CNF:
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_2
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_1
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_0
c  in DIMACS:
 11873  11874 -11875  684 -11876 0
 11873  11874 -11875  684 -11877 0
 11873  11874 -11875  684 -11878 0

c  0-1 --> -1
c    (-b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧ -p_684) -> ( b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0)
c  in CNF:
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨  b^{12, 58}_2
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_1
c     b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨  b^{12, 58}_0
c  in DIMACS:
 11873  11874  11875  684  11876 0
 11873  11874  11875  684 -11877 0
 11873  11874  11875  684  11878 0

c  -1-1 --> -2
c    ( b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧  b^{12, 57}_0 ∧ -p_684) -> ( b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0)
c  in CNF:
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨  b^{12, 58}_2
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨  b^{12, 58}_1
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨  p_684 ∨ -b^{12, 58}_0
c  in DIMACS:
-11873  11874 -11875  684  11876 0
-11873  11874 -11875  684  11877 0
-11873  11874 -11875  684 -11878 0

c  -2-1 --> break 
c    ( b^{12, 57}_2 ∧  b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨  b^{12, 57}_0 ∨  p_684 ∨ break
c  in DIMACS:
-11873 -11874  11875  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 57}_2 ∧ -b^{12, 57}_1 ∧ -b^{12, 57}_0 ∧ true) 
c  in CNF:
c    -b^{12, 57}_2 ∨  b^{12, 57}_1 ∨  b^{12, 57}_0 ∨ false 
c  in DIMACS:
-11873  11874  11875  0

c  3 does not represent an automaton state.
c    -(-b^{12, 57}_2 ∧  b^{12, 57}_1 ∧  b^{12, 57}_0 ∧ true) 
c  in CNF:
c     b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ false 
c  in DIMACS:
 11873 -11874 -11875  0
c  -3 does not represent an automaton state.
c    -( b^{12, 57}_2 ∧  b^{12, 57}_1 ∧  b^{12, 57}_0 ∧ true) 
c  in CNF:
c    -b^{12, 57}_2 ∨ -b^{12, 57}_1 ∨ -b^{12, 57}_0 ∨ false 
c  in DIMACS:
-11873 -11874 -11875  0

c i = 58
c  -2+1 --> -1
c    ( b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧  p_696) -> ( b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0)
c  in CNF:
c    -b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨  b^{12, 59}_2
c    -b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_1
c    -b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨  b^{12, 59}_0
c  in DIMACS:
-11876 -11877  11878 -696  11879 0
-11876 -11877  11878 -696 -11880 0
-11876 -11877  11878 -696  11881 0

c  -1+1 --> 0
c    ( b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0 ∧  p_696) -> (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧ -b^{12, 59}_0)
c  in CNF:
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_2
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_1
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_0
c  in DIMACS:
-11876  11877 -11878 -696 -11879 0
-11876  11877 -11878 -696 -11880 0
-11876  11877 -11878 -696 -11881 0

c  0+1 --> 1
c    (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧  p_696) -> (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0)
c  in CNF:
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_2
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_1
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨  b^{12, 59}_0
c  in DIMACS:
 11876  11877  11878 -696 -11879 0
 11876  11877  11878 -696 -11880 0
 11876  11877  11878 -696  11881 0

c  1+1 --> 2
c    (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0 ∧  p_696) -> (-b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0)
c  in CNF:
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_2
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨  b^{12, 59}_1
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ -p_696 ∨ -b^{12, 59}_0
c  in DIMACS:
 11876  11877 -11878 -696 -11879 0
 11876  11877 -11878 -696  11880 0
 11876  11877 -11878 -696 -11881 0

c  2+1 --> break 
c    (-b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧  p_696) -> break
c  in CNF:
c     b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 11876 -11877  11878 -696 1162 0


c  2-1 --> 1
c    (-b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧ -p_696) -> (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0)
c  in CNF:
c     b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_2
c     b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_1
c     b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨  b^{12, 59}_0
c  in DIMACS:
 11876 -11877  11878  696 -11879 0
 11876 -11877  11878  696 -11880 0
 11876 -11877  11878  696  11881 0

c  1-1 --> 0
c    (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0 ∧ -p_696) -> (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧ -b^{12, 59}_0)
c  in CNF:
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_2
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_1
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_0
c  in DIMACS:
 11876  11877 -11878  696 -11879 0
 11876  11877 -11878  696 -11880 0
 11876  11877 -11878  696 -11881 0

c  0-1 --> -1
c    (-b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧ -p_696) -> ( b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0)
c  in CNF:
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨  b^{12, 59}_2
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_1
c     b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨  b^{12, 59}_0
c  in DIMACS:
 11876  11877  11878  696  11879 0
 11876  11877  11878  696 -11880 0
 11876  11877  11878  696  11881 0

c  -1-1 --> -2
c    ( b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧  b^{12, 58}_0 ∧ -p_696) -> ( b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0)
c  in CNF:
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨  b^{12, 59}_2
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨  b^{12, 59}_1
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨  p_696 ∨ -b^{12, 59}_0
c  in DIMACS:
-11876  11877 -11878  696  11879 0
-11876  11877 -11878  696  11880 0
-11876  11877 -11878  696 -11881 0

c  -2-1 --> break 
c    ( b^{12, 58}_2 ∧  b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨  b^{12, 58}_0 ∨  p_696 ∨ break
c  in DIMACS:
-11876 -11877  11878  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 58}_2 ∧ -b^{12, 58}_1 ∧ -b^{12, 58}_0 ∧ true) 
c  in CNF:
c    -b^{12, 58}_2 ∨  b^{12, 58}_1 ∨  b^{12, 58}_0 ∨ false 
c  in DIMACS:
-11876  11877  11878  0

c  3 does not represent an automaton state.
c    -(-b^{12, 58}_2 ∧  b^{12, 58}_1 ∧  b^{12, 58}_0 ∧ true) 
c  in CNF:
c     b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ false 
c  in DIMACS:
 11876 -11877 -11878  0
c  -3 does not represent an automaton state.
c    -( b^{12, 58}_2 ∧  b^{12, 58}_1 ∧  b^{12, 58}_0 ∧ true) 
c  in CNF:
c    -b^{12, 58}_2 ∨ -b^{12, 58}_1 ∨ -b^{12, 58}_0 ∨ false 
c  in DIMACS:
-11876 -11877 -11878  0

c i = 59
c  -2+1 --> -1
c    ( b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧  p_708) -> ( b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0)
c  in CNF:
c    -b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨  b^{12, 60}_2
c    -b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_1
c    -b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨  b^{12, 60}_0
c  in DIMACS:
-11879 -11880  11881 -708  11882 0
-11879 -11880  11881 -708 -11883 0
-11879 -11880  11881 -708  11884 0

c  -1+1 --> 0
c    ( b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0 ∧  p_708) -> (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧ -b^{12, 60}_0)
c  in CNF:
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_2
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_1
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_0
c  in DIMACS:
-11879  11880 -11881 -708 -11882 0
-11879  11880 -11881 -708 -11883 0
-11879  11880 -11881 -708 -11884 0

c  0+1 --> 1
c    (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧  p_708) -> (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0)
c  in CNF:
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_2
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_1
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨  b^{12, 60}_0
c  in DIMACS:
 11879  11880  11881 -708 -11882 0
 11879  11880  11881 -708 -11883 0
 11879  11880  11881 -708  11884 0

c  1+1 --> 2
c    (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0 ∧  p_708) -> (-b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0)
c  in CNF:
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_2
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨  b^{12, 60}_1
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ -p_708 ∨ -b^{12, 60}_0
c  in DIMACS:
 11879  11880 -11881 -708 -11882 0
 11879  11880 -11881 -708  11883 0
 11879  11880 -11881 -708 -11884 0

c  2+1 --> break 
c    (-b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧  p_708) -> break
c  in CNF:
c     b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 11879 -11880  11881 -708 1162 0


c  2-1 --> 1
c    (-b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧ -p_708) -> (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0)
c  in CNF:
c     b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_2
c     b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_1
c     b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨  b^{12, 60}_0
c  in DIMACS:
 11879 -11880  11881  708 -11882 0
 11879 -11880  11881  708 -11883 0
 11879 -11880  11881  708  11884 0

c  1-1 --> 0
c    (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0 ∧ -p_708) -> (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧ -b^{12, 60}_0)
c  in CNF:
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_2
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_1
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_0
c  in DIMACS:
 11879  11880 -11881  708 -11882 0
 11879  11880 -11881  708 -11883 0
 11879  11880 -11881  708 -11884 0

c  0-1 --> -1
c    (-b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧ -p_708) -> ( b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0)
c  in CNF:
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨  b^{12, 60}_2
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_1
c     b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨  b^{12, 60}_0
c  in DIMACS:
 11879  11880  11881  708  11882 0
 11879  11880  11881  708 -11883 0
 11879  11880  11881  708  11884 0

c  -1-1 --> -2
c    ( b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧  b^{12, 59}_0 ∧ -p_708) -> ( b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0)
c  in CNF:
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨  b^{12, 60}_2
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨  b^{12, 60}_1
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨  p_708 ∨ -b^{12, 60}_0
c  in DIMACS:
-11879  11880 -11881  708  11882 0
-11879  11880 -11881  708  11883 0
-11879  11880 -11881  708 -11884 0

c  -2-1 --> break 
c    ( b^{12, 59}_2 ∧  b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨  b^{12, 59}_0 ∨  p_708 ∨ break
c  in DIMACS:
-11879 -11880  11881  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 59}_2 ∧ -b^{12, 59}_1 ∧ -b^{12, 59}_0 ∧ true) 
c  in CNF:
c    -b^{12, 59}_2 ∨  b^{12, 59}_1 ∨  b^{12, 59}_0 ∨ false 
c  in DIMACS:
-11879  11880  11881  0

c  3 does not represent an automaton state.
c    -(-b^{12, 59}_2 ∧  b^{12, 59}_1 ∧  b^{12, 59}_0 ∧ true) 
c  in CNF:
c     b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ false 
c  in DIMACS:
 11879 -11880 -11881  0
c  -3 does not represent an automaton state.
c    -( b^{12, 59}_2 ∧  b^{12, 59}_1 ∧  b^{12, 59}_0 ∧ true) 
c  in CNF:
c    -b^{12, 59}_2 ∨ -b^{12, 59}_1 ∨ -b^{12, 59}_0 ∨ false 
c  in DIMACS:
-11879 -11880 -11881  0

c i = 60
c  -2+1 --> -1
c    ( b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧  p_720) -> ( b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0)
c  in CNF:
c    -b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨  b^{12, 61}_2
c    -b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_1
c    -b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨  b^{12, 61}_0
c  in DIMACS:
-11882 -11883  11884 -720  11885 0
-11882 -11883  11884 -720 -11886 0
-11882 -11883  11884 -720  11887 0

c  -1+1 --> 0
c    ( b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0 ∧  p_720) -> (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧ -b^{12, 61}_0)
c  in CNF:
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_2
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_1
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_0
c  in DIMACS:
-11882  11883 -11884 -720 -11885 0
-11882  11883 -11884 -720 -11886 0
-11882  11883 -11884 -720 -11887 0

c  0+1 --> 1
c    (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧  p_720) -> (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0)
c  in CNF:
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_2
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_1
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨  b^{12, 61}_0
c  in DIMACS:
 11882  11883  11884 -720 -11885 0
 11882  11883  11884 -720 -11886 0
 11882  11883  11884 -720  11887 0

c  1+1 --> 2
c    (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0 ∧  p_720) -> (-b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0)
c  in CNF:
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_2
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨  b^{12, 61}_1
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ -p_720 ∨ -b^{12, 61}_0
c  in DIMACS:
 11882  11883 -11884 -720 -11885 0
 11882  11883 -11884 -720  11886 0
 11882  11883 -11884 -720 -11887 0

c  2+1 --> break 
c    (-b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧  p_720) -> break
c  in CNF:
c     b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 11882 -11883  11884 -720 1162 0


c  2-1 --> 1
c    (-b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧ -p_720) -> (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0)
c  in CNF:
c     b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_2
c     b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_1
c     b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨  b^{12, 61}_0
c  in DIMACS:
 11882 -11883  11884  720 -11885 0
 11882 -11883  11884  720 -11886 0
 11882 -11883  11884  720  11887 0

c  1-1 --> 0
c    (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0 ∧ -p_720) -> (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧ -b^{12, 61}_0)
c  in CNF:
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_2
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_1
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_0
c  in DIMACS:
 11882  11883 -11884  720 -11885 0
 11882  11883 -11884  720 -11886 0
 11882  11883 -11884  720 -11887 0

c  0-1 --> -1
c    (-b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧ -p_720) -> ( b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0)
c  in CNF:
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨  b^{12, 61}_2
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_1
c     b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨  b^{12, 61}_0
c  in DIMACS:
 11882  11883  11884  720  11885 0
 11882  11883  11884  720 -11886 0
 11882  11883  11884  720  11887 0

c  -1-1 --> -2
c    ( b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧  b^{12, 60}_0 ∧ -p_720) -> ( b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0)
c  in CNF:
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨  b^{12, 61}_2
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨  b^{12, 61}_1
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨  p_720 ∨ -b^{12, 61}_0
c  in DIMACS:
-11882  11883 -11884  720  11885 0
-11882  11883 -11884  720  11886 0
-11882  11883 -11884  720 -11887 0

c  -2-1 --> break 
c    ( b^{12, 60}_2 ∧  b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨  b^{12, 60}_0 ∨  p_720 ∨ break
c  in DIMACS:
-11882 -11883  11884  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 60}_2 ∧ -b^{12, 60}_1 ∧ -b^{12, 60}_0 ∧ true) 
c  in CNF:
c    -b^{12, 60}_2 ∨  b^{12, 60}_1 ∨  b^{12, 60}_0 ∨ false 
c  in DIMACS:
-11882  11883  11884  0

c  3 does not represent an automaton state.
c    -(-b^{12, 60}_2 ∧  b^{12, 60}_1 ∧  b^{12, 60}_0 ∧ true) 
c  in CNF:
c     b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ false 
c  in DIMACS:
 11882 -11883 -11884  0
c  -3 does not represent an automaton state.
c    -( b^{12, 60}_2 ∧  b^{12, 60}_1 ∧  b^{12, 60}_0 ∧ true) 
c  in CNF:
c    -b^{12, 60}_2 ∨ -b^{12, 60}_1 ∨ -b^{12, 60}_0 ∨ false 
c  in DIMACS:
-11882 -11883 -11884  0

c i = 61
c  -2+1 --> -1
c    ( b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧  p_732) -> ( b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0)
c  in CNF:
c    -b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨  b^{12, 62}_2
c    -b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_1
c    -b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨  b^{12, 62}_0
c  in DIMACS:
-11885 -11886  11887 -732  11888 0
-11885 -11886  11887 -732 -11889 0
-11885 -11886  11887 -732  11890 0

c  -1+1 --> 0
c    ( b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0 ∧  p_732) -> (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧ -b^{12, 62}_0)
c  in CNF:
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_2
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_1
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_0
c  in DIMACS:
-11885  11886 -11887 -732 -11888 0
-11885  11886 -11887 -732 -11889 0
-11885  11886 -11887 -732 -11890 0

c  0+1 --> 1
c    (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧  p_732) -> (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0)
c  in CNF:
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_2
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_1
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨  b^{12, 62}_0
c  in DIMACS:
 11885  11886  11887 -732 -11888 0
 11885  11886  11887 -732 -11889 0
 11885  11886  11887 -732  11890 0

c  1+1 --> 2
c    (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0 ∧  p_732) -> (-b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0)
c  in CNF:
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_2
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨  b^{12, 62}_1
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ -p_732 ∨ -b^{12, 62}_0
c  in DIMACS:
 11885  11886 -11887 -732 -11888 0
 11885  11886 -11887 -732  11889 0
 11885  11886 -11887 -732 -11890 0

c  2+1 --> break 
c    (-b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧  p_732) -> break
c  in CNF:
c     b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 11885 -11886  11887 -732 1162 0


c  2-1 --> 1
c    (-b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧ -p_732) -> (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0)
c  in CNF:
c     b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_2
c     b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_1
c     b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨  b^{12, 62}_0
c  in DIMACS:
 11885 -11886  11887  732 -11888 0
 11885 -11886  11887  732 -11889 0
 11885 -11886  11887  732  11890 0

c  1-1 --> 0
c    (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0 ∧ -p_732) -> (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧ -b^{12, 62}_0)
c  in CNF:
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_2
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_1
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_0
c  in DIMACS:
 11885  11886 -11887  732 -11888 0
 11885  11886 -11887  732 -11889 0
 11885  11886 -11887  732 -11890 0

c  0-1 --> -1
c    (-b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧ -p_732) -> ( b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0)
c  in CNF:
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨  b^{12, 62}_2
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_1
c     b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨  b^{12, 62}_0
c  in DIMACS:
 11885  11886  11887  732  11888 0
 11885  11886  11887  732 -11889 0
 11885  11886  11887  732  11890 0

c  -1-1 --> -2
c    ( b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧  b^{12, 61}_0 ∧ -p_732) -> ( b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0)
c  in CNF:
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨  b^{12, 62}_2
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨  b^{12, 62}_1
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨  p_732 ∨ -b^{12, 62}_0
c  in DIMACS:
-11885  11886 -11887  732  11888 0
-11885  11886 -11887  732  11889 0
-11885  11886 -11887  732 -11890 0

c  -2-1 --> break 
c    ( b^{12, 61}_2 ∧  b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨  b^{12, 61}_0 ∨  p_732 ∨ break
c  in DIMACS:
-11885 -11886  11887  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 61}_2 ∧ -b^{12, 61}_1 ∧ -b^{12, 61}_0 ∧ true) 
c  in CNF:
c    -b^{12, 61}_2 ∨  b^{12, 61}_1 ∨  b^{12, 61}_0 ∨ false 
c  in DIMACS:
-11885  11886  11887  0

c  3 does not represent an automaton state.
c    -(-b^{12, 61}_2 ∧  b^{12, 61}_1 ∧  b^{12, 61}_0 ∧ true) 
c  in CNF:
c     b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ false 
c  in DIMACS:
 11885 -11886 -11887  0
c  -3 does not represent an automaton state.
c    -( b^{12, 61}_2 ∧  b^{12, 61}_1 ∧  b^{12, 61}_0 ∧ true) 
c  in CNF:
c    -b^{12, 61}_2 ∨ -b^{12, 61}_1 ∨ -b^{12, 61}_0 ∨ false 
c  in DIMACS:
-11885 -11886 -11887  0

c i = 62
c  -2+1 --> -1
c    ( b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧  p_744) -> ( b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0)
c  in CNF:
c    -b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨  b^{12, 63}_2
c    -b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_1
c    -b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨  b^{12, 63}_0
c  in DIMACS:
-11888 -11889  11890 -744  11891 0
-11888 -11889  11890 -744 -11892 0
-11888 -11889  11890 -744  11893 0

c  -1+1 --> 0
c    ( b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0 ∧  p_744) -> (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧ -b^{12, 63}_0)
c  in CNF:
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_2
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_1
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_0
c  in DIMACS:
-11888  11889 -11890 -744 -11891 0
-11888  11889 -11890 -744 -11892 0
-11888  11889 -11890 -744 -11893 0

c  0+1 --> 1
c    (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧  p_744) -> (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0)
c  in CNF:
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_2
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_1
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨  b^{12, 63}_0
c  in DIMACS:
 11888  11889  11890 -744 -11891 0
 11888  11889  11890 -744 -11892 0
 11888  11889  11890 -744  11893 0

c  1+1 --> 2
c    (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0 ∧  p_744) -> (-b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0)
c  in CNF:
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_2
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨  b^{12, 63}_1
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ -p_744 ∨ -b^{12, 63}_0
c  in DIMACS:
 11888  11889 -11890 -744 -11891 0
 11888  11889 -11890 -744  11892 0
 11888  11889 -11890 -744 -11893 0

c  2+1 --> break 
c    (-b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧  p_744) -> break
c  in CNF:
c     b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 11888 -11889  11890 -744 1162 0


c  2-1 --> 1
c    (-b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧ -p_744) -> (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0)
c  in CNF:
c     b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_2
c     b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_1
c     b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨  b^{12, 63}_0
c  in DIMACS:
 11888 -11889  11890  744 -11891 0
 11888 -11889  11890  744 -11892 0
 11888 -11889  11890  744  11893 0

c  1-1 --> 0
c    (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0 ∧ -p_744) -> (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧ -b^{12, 63}_0)
c  in CNF:
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_2
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_1
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_0
c  in DIMACS:
 11888  11889 -11890  744 -11891 0
 11888  11889 -11890  744 -11892 0
 11888  11889 -11890  744 -11893 0

c  0-1 --> -1
c    (-b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧ -p_744) -> ( b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0)
c  in CNF:
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨  b^{12, 63}_2
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_1
c     b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨  b^{12, 63}_0
c  in DIMACS:
 11888  11889  11890  744  11891 0
 11888  11889  11890  744 -11892 0
 11888  11889  11890  744  11893 0

c  -1-1 --> -2
c    ( b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧  b^{12, 62}_0 ∧ -p_744) -> ( b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0)
c  in CNF:
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨  b^{12, 63}_2
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨  b^{12, 63}_1
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨  p_744 ∨ -b^{12, 63}_0
c  in DIMACS:
-11888  11889 -11890  744  11891 0
-11888  11889 -11890  744  11892 0
-11888  11889 -11890  744 -11893 0

c  -2-1 --> break 
c    ( b^{12, 62}_2 ∧  b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨  b^{12, 62}_0 ∨  p_744 ∨ break
c  in DIMACS:
-11888 -11889  11890  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 62}_2 ∧ -b^{12, 62}_1 ∧ -b^{12, 62}_0 ∧ true) 
c  in CNF:
c    -b^{12, 62}_2 ∨  b^{12, 62}_1 ∨  b^{12, 62}_0 ∨ false 
c  in DIMACS:
-11888  11889  11890  0

c  3 does not represent an automaton state.
c    -(-b^{12, 62}_2 ∧  b^{12, 62}_1 ∧  b^{12, 62}_0 ∧ true) 
c  in CNF:
c     b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ false 
c  in DIMACS:
 11888 -11889 -11890  0
c  -3 does not represent an automaton state.
c    -( b^{12, 62}_2 ∧  b^{12, 62}_1 ∧  b^{12, 62}_0 ∧ true) 
c  in CNF:
c    -b^{12, 62}_2 ∨ -b^{12, 62}_1 ∨ -b^{12, 62}_0 ∨ false 
c  in DIMACS:
-11888 -11889 -11890  0

c i = 63
c  -2+1 --> -1
c    ( b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧  p_756) -> ( b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0)
c  in CNF:
c    -b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨  b^{12, 64}_2
c    -b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_1
c    -b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨  b^{12, 64}_0
c  in DIMACS:
-11891 -11892  11893 -756  11894 0
-11891 -11892  11893 -756 -11895 0
-11891 -11892  11893 -756  11896 0

c  -1+1 --> 0
c    ( b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0 ∧  p_756) -> (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧ -b^{12, 64}_0)
c  in CNF:
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_2
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_1
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_0
c  in DIMACS:
-11891  11892 -11893 -756 -11894 0
-11891  11892 -11893 -756 -11895 0
-11891  11892 -11893 -756 -11896 0

c  0+1 --> 1
c    (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧  p_756) -> (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0)
c  in CNF:
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_2
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_1
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨  b^{12, 64}_0
c  in DIMACS:
 11891  11892  11893 -756 -11894 0
 11891  11892  11893 -756 -11895 0
 11891  11892  11893 -756  11896 0

c  1+1 --> 2
c    (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0 ∧  p_756) -> (-b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0)
c  in CNF:
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_2
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨  b^{12, 64}_1
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ -p_756 ∨ -b^{12, 64}_0
c  in DIMACS:
 11891  11892 -11893 -756 -11894 0
 11891  11892 -11893 -756  11895 0
 11891  11892 -11893 -756 -11896 0

c  2+1 --> break 
c    (-b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧  p_756) -> break
c  in CNF:
c     b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 11891 -11892  11893 -756 1162 0


c  2-1 --> 1
c    (-b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧ -p_756) -> (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0)
c  in CNF:
c     b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_2
c     b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_1
c     b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨  b^{12, 64}_0
c  in DIMACS:
 11891 -11892  11893  756 -11894 0
 11891 -11892  11893  756 -11895 0
 11891 -11892  11893  756  11896 0

c  1-1 --> 0
c    (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0 ∧ -p_756) -> (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧ -b^{12, 64}_0)
c  in CNF:
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_2
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_1
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_0
c  in DIMACS:
 11891  11892 -11893  756 -11894 0
 11891  11892 -11893  756 -11895 0
 11891  11892 -11893  756 -11896 0

c  0-1 --> -1
c    (-b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧ -p_756) -> ( b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0)
c  in CNF:
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨  b^{12, 64}_2
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_1
c     b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨  b^{12, 64}_0
c  in DIMACS:
 11891  11892  11893  756  11894 0
 11891  11892  11893  756 -11895 0
 11891  11892  11893  756  11896 0

c  -1-1 --> -2
c    ( b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧  b^{12, 63}_0 ∧ -p_756) -> ( b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0)
c  in CNF:
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨  b^{12, 64}_2
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨  b^{12, 64}_1
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨  p_756 ∨ -b^{12, 64}_0
c  in DIMACS:
-11891  11892 -11893  756  11894 0
-11891  11892 -11893  756  11895 0
-11891  11892 -11893  756 -11896 0

c  -2-1 --> break 
c    ( b^{12, 63}_2 ∧  b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨  b^{12, 63}_0 ∨  p_756 ∨ break
c  in DIMACS:
-11891 -11892  11893  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 63}_2 ∧ -b^{12, 63}_1 ∧ -b^{12, 63}_0 ∧ true) 
c  in CNF:
c    -b^{12, 63}_2 ∨  b^{12, 63}_1 ∨  b^{12, 63}_0 ∨ false 
c  in DIMACS:
-11891  11892  11893  0

c  3 does not represent an automaton state.
c    -(-b^{12, 63}_2 ∧  b^{12, 63}_1 ∧  b^{12, 63}_0 ∧ true) 
c  in CNF:
c     b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ false 
c  in DIMACS:
 11891 -11892 -11893  0
c  -3 does not represent an automaton state.
c    -( b^{12, 63}_2 ∧  b^{12, 63}_1 ∧  b^{12, 63}_0 ∧ true) 
c  in CNF:
c    -b^{12, 63}_2 ∨ -b^{12, 63}_1 ∨ -b^{12, 63}_0 ∨ false 
c  in DIMACS:
-11891 -11892 -11893  0

c i = 64
c  -2+1 --> -1
c    ( b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧  p_768) -> ( b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0)
c  in CNF:
c    -b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨  b^{12, 65}_2
c    -b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_1
c    -b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨  b^{12, 65}_0
c  in DIMACS:
-11894 -11895  11896 -768  11897 0
-11894 -11895  11896 -768 -11898 0
-11894 -11895  11896 -768  11899 0

c  -1+1 --> 0
c    ( b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0 ∧  p_768) -> (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧ -b^{12, 65}_0)
c  in CNF:
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_2
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_1
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_0
c  in DIMACS:
-11894  11895 -11896 -768 -11897 0
-11894  11895 -11896 -768 -11898 0
-11894  11895 -11896 -768 -11899 0

c  0+1 --> 1
c    (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧  p_768) -> (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0)
c  in CNF:
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_2
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_1
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨  b^{12, 65}_0
c  in DIMACS:
 11894  11895  11896 -768 -11897 0
 11894  11895  11896 -768 -11898 0
 11894  11895  11896 -768  11899 0

c  1+1 --> 2
c    (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0 ∧  p_768) -> (-b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0)
c  in CNF:
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_2
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨  b^{12, 65}_1
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ -p_768 ∨ -b^{12, 65}_0
c  in DIMACS:
 11894  11895 -11896 -768 -11897 0
 11894  11895 -11896 -768  11898 0
 11894  11895 -11896 -768 -11899 0

c  2+1 --> break 
c    (-b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧  p_768) -> break
c  in CNF:
c     b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 11894 -11895  11896 -768 1162 0


c  2-1 --> 1
c    (-b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧ -p_768) -> (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0)
c  in CNF:
c     b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_2
c     b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_1
c     b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨  b^{12, 65}_0
c  in DIMACS:
 11894 -11895  11896  768 -11897 0
 11894 -11895  11896  768 -11898 0
 11894 -11895  11896  768  11899 0

c  1-1 --> 0
c    (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0 ∧ -p_768) -> (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧ -b^{12, 65}_0)
c  in CNF:
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_2
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_1
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_0
c  in DIMACS:
 11894  11895 -11896  768 -11897 0
 11894  11895 -11896  768 -11898 0
 11894  11895 -11896  768 -11899 0

c  0-1 --> -1
c    (-b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧ -p_768) -> ( b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0)
c  in CNF:
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨  b^{12, 65}_2
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_1
c     b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨  b^{12, 65}_0
c  in DIMACS:
 11894  11895  11896  768  11897 0
 11894  11895  11896  768 -11898 0
 11894  11895  11896  768  11899 0

c  -1-1 --> -2
c    ( b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧  b^{12, 64}_0 ∧ -p_768) -> ( b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0)
c  in CNF:
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨  b^{12, 65}_2
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨  b^{12, 65}_1
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨  p_768 ∨ -b^{12, 65}_0
c  in DIMACS:
-11894  11895 -11896  768  11897 0
-11894  11895 -11896  768  11898 0
-11894  11895 -11896  768 -11899 0

c  -2-1 --> break 
c    ( b^{12, 64}_2 ∧  b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨  b^{12, 64}_0 ∨  p_768 ∨ break
c  in DIMACS:
-11894 -11895  11896  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 64}_2 ∧ -b^{12, 64}_1 ∧ -b^{12, 64}_0 ∧ true) 
c  in CNF:
c    -b^{12, 64}_2 ∨  b^{12, 64}_1 ∨  b^{12, 64}_0 ∨ false 
c  in DIMACS:
-11894  11895  11896  0

c  3 does not represent an automaton state.
c    -(-b^{12, 64}_2 ∧  b^{12, 64}_1 ∧  b^{12, 64}_0 ∧ true) 
c  in CNF:
c     b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ false 
c  in DIMACS:
 11894 -11895 -11896  0
c  -3 does not represent an automaton state.
c    -( b^{12, 64}_2 ∧  b^{12, 64}_1 ∧  b^{12, 64}_0 ∧ true) 
c  in CNF:
c    -b^{12, 64}_2 ∨ -b^{12, 64}_1 ∨ -b^{12, 64}_0 ∨ false 
c  in DIMACS:
-11894 -11895 -11896  0

c i = 65
c  -2+1 --> -1
c    ( b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧  p_780) -> ( b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0)
c  in CNF:
c    -b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨  b^{12, 66}_2
c    -b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_1
c    -b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨  b^{12, 66}_0
c  in DIMACS:
-11897 -11898  11899 -780  11900 0
-11897 -11898  11899 -780 -11901 0
-11897 -11898  11899 -780  11902 0

c  -1+1 --> 0
c    ( b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0 ∧  p_780) -> (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧ -b^{12, 66}_0)
c  in CNF:
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_2
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_1
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_0
c  in DIMACS:
-11897  11898 -11899 -780 -11900 0
-11897  11898 -11899 -780 -11901 0
-11897  11898 -11899 -780 -11902 0

c  0+1 --> 1
c    (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧  p_780) -> (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0)
c  in CNF:
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_2
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_1
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨  b^{12, 66}_0
c  in DIMACS:
 11897  11898  11899 -780 -11900 0
 11897  11898  11899 -780 -11901 0
 11897  11898  11899 -780  11902 0

c  1+1 --> 2
c    (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0 ∧  p_780) -> (-b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0)
c  in CNF:
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_2
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨  b^{12, 66}_1
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ -p_780 ∨ -b^{12, 66}_0
c  in DIMACS:
 11897  11898 -11899 -780 -11900 0
 11897  11898 -11899 -780  11901 0
 11897  11898 -11899 -780 -11902 0

c  2+1 --> break 
c    (-b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧  p_780) -> break
c  in CNF:
c     b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 11897 -11898  11899 -780 1162 0


c  2-1 --> 1
c    (-b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧ -p_780) -> (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0)
c  in CNF:
c     b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_2
c     b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_1
c     b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨  b^{12, 66}_0
c  in DIMACS:
 11897 -11898  11899  780 -11900 0
 11897 -11898  11899  780 -11901 0
 11897 -11898  11899  780  11902 0

c  1-1 --> 0
c    (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0 ∧ -p_780) -> (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧ -b^{12, 66}_0)
c  in CNF:
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_2
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_1
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_0
c  in DIMACS:
 11897  11898 -11899  780 -11900 0
 11897  11898 -11899  780 -11901 0
 11897  11898 -11899  780 -11902 0

c  0-1 --> -1
c    (-b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧ -p_780) -> ( b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0)
c  in CNF:
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨  b^{12, 66}_2
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_1
c     b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨  b^{12, 66}_0
c  in DIMACS:
 11897  11898  11899  780  11900 0
 11897  11898  11899  780 -11901 0
 11897  11898  11899  780  11902 0

c  -1-1 --> -2
c    ( b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧  b^{12, 65}_0 ∧ -p_780) -> ( b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0)
c  in CNF:
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨  b^{12, 66}_2
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨  b^{12, 66}_1
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨  p_780 ∨ -b^{12, 66}_0
c  in DIMACS:
-11897  11898 -11899  780  11900 0
-11897  11898 -11899  780  11901 0
-11897  11898 -11899  780 -11902 0

c  -2-1 --> break 
c    ( b^{12, 65}_2 ∧  b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨  b^{12, 65}_0 ∨  p_780 ∨ break
c  in DIMACS:
-11897 -11898  11899  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 65}_2 ∧ -b^{12, 65}_1 ∧ -b^{12, 65}_0 ∧ true) 
c  in CNF:
c    -b^{12, 65}_2 ∨  b^{12, 65}_1 ∨  b^{12, 65}_0 ∨ false 
c  in DIMACS:
-11897  11898  11899  0

c  3 does not represent an automaton state.
c    -(-b^{12, 65}_2 ∧  b^{12, 65}_1 ∧  b^{12, 65}_0 ∧ true) 
c  in CNF:
c     b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ false 
c  in DIMACS:
 11897 -11898 -11899  0
c  -3 does not represent an automaton state.
c    -( b^{12, 65}_2 ∧  b^{12, 65}_1 ∧  b^{12, 65}_0 ∧ true) 
c  in CNF:
c    -b^{12, 65}_2 ∨ -b^{12, 65}_1 ∨ -b^{12, 65}_0 ∨ false 
c  in DIMACS:
-11897 -11898 -11899  0

c i = 66
c  -2+1 --> -1
c    ( b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧  p_792) -> ( b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0)
c  in CNF:
c    -b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨  b^{12, 67}_2
c    -b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_1
c    -b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨  b^{12, 67}_0
c  in DIMACS:
-11900 -11901  11902 -792  11903 0
-11900 -11901  11902 -792 -11904 0
-11900 -11901  11902 -792  11905 0

c  -1+1 --> 0
c    ( b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0 ∧  p_792) -> (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧ -b^{12, 67}_0)
c  in CNF:
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_2
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_1
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_0
c  in DIMACS:
-11900  11901 -11902 -792 -11903 0
-11900  11901 -11902 -792 -11904 0
-11900  11901 -11902 -792 -11905 0

c  0+1 --> 1
c    (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧  p_792) -> (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0)
c  in CNF:
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_2
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_1
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨  b^{12, 67}_0
c  in DIMACS:
 11900  11901  11902 -792 -11903 0
 11900  11901  11902 -792 -11904 0
 11900  11901  11902 -792  11905 0

c  1+1 --> 2
c    (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0 ∧  p_792) -> (-b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0)
c  in CNF:
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_2
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨  b^{12, 67}_1
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ -p_792 ∨ -b^{12, 67}_0
c  in DIMACS:
 11900  11901 -11902 -792 -11903 0
 11900  11901 -11902 -792  11904 0
 11900  11901 -11902 -792 -11905 0

c  2+1 --> break 
c    (-b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧  p_792) -> break
c  in CNF:
c     b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 11900 -11901  11902 -792 1162 0


c  2-1 --> 1
c    (-b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧ -p_792) -> (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0)
c  in CNF:
c     b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_2
c     b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_1
c     b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨  b^{12, 67}_0
c  in DIMACS:
 11900 -11901  11902  792 -11903 0
 11900 -11901  11902  792 -11904 0
 11900 -11901  11902  792  11905 0

c  1-1 --> 0
c    (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0 ∧ -p_792) -> (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧ -b^{12, 67}_0)
c  in CNF:
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_2
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_1
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_0
c  in DIMACS:
 11900  11901 -11902  792 -11903 0
 11900  11901 -11902  792 -11904 0
 11900  11901 -11902  792 -11905 0

c  0-1 --> -1
c    (-b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧ -p_792) -> ( b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0)
c  in CNF:
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨  b^{12, 67}_2
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_1
c     b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨  b^{12, 67}_0
c  in DIMACS:
 11900  11901  11902  792  11903 0
 11900  11901  11902  792 -11904 0
 11900  11901  11902  792  11905 0

c  -1-1 --> -2
c    ( b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧  b^{12, 66}_0 ∧ -p_792) -> ( b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0)
c  in CNF:
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨  b^{12, 67}_2
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨  b^{12, 67}_1
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨  p_792 ∨ -b^{12, 67}_0
c  in DIMACS:
-11900  11901 -11902  792  11903 0
-11900  11901 -11902  792  11904 0
-11900  11901 -11902  792 -11905 0

c  -2-1 --> break 
c    ( b^{12, 66}_2 ∧  b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨  b^{12, 66}_0 ∨  p_792 ∨ break
c  in DIMACS:
-11900 -11901  11902  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 66}_2 ∧ -b^{12, 66}_1 ∧ -b^{12, 66}_0 ∧ true) 
c  in CNF:
c    -b^{12, 66}_2 ∨  b^{12, 66}_1 ∨  b^{12, 66}_0 ∨ false 
c  in DIMACS:
-11900  11901  11902  0

c  3 does not represent an automaton state.
c    -(-b^{12, 66}_2 ∧  b^{12, 66}_1 ∧  b^{12, 66}_0 ∧ true) 
c  in CNF:
c     b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ false 
c  in DIMACS:
 11900 -11901 -11902  0
c  -3 does not represent an automaton state.
c    -( b^{12, 66}_2 ∧  b^{12, 66}_1 ∧  b^{12, 66}_0 ∧ true) 
c  in CNF:
c    -b^{12, 66}_2 ∨ -b^{12, 66}_1 ∨ -b^{12, 66}_0 ∨ false 
c  in DIMACS:
-11900 -11901 -11902  0

c i = 67
c  -2+1 --> -1
c    ( b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧  p_804) -> ( b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0)
c  in CNF:
c    -b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨  b^{12, 68}_2
c    -b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_1
c    -b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨  b^{12, 68}_0
c  in DIMACS:
-11903 -11904  11905 -804  11906 0
-11903 -11904  11905 -804 -11907 0
-11903 -11904  11905 -804  11908 0

c  -1+1 --> 0
c    ( b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0 ∧  p_804) -> (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧ -b^{12, 68}_0)
c  in CNF:
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_2
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_1
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_0
c  in DIMACS:
-11903  11904 -11905 -804 -11906 0
-11903  11904 -11905 -804 -11907 0
-11903  11904 -11905 -804 -11908 0

c  0+1 --> 1
c    (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧  p_804) -> (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0)
c  in CNF:
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_2
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_1
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨  b^{12, 68}_0
c  in DIMACS:
 11903  11904  11905 -804 -11906 0
 11903  11904  11905 -804 -11907 0
 11903  11904  11905 -804  11908 0

c  1+1 --> 2
c    (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0 ∧  p_804) -> (-b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0)
c  in CNF:
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_2
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨  b^{12, 68}_1
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ -p_804 ∨ -b^{12, 68}_0
c  in DIMACS:
 11903  11904 -11905 -804 -11906 0
 11903  11904 -11905 -804  11907 0
 11903  11904 -11905 -804 -11908 0

c  2+1 --> break 
c    (-b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧  p_804) -> break
c  in CNF:
c     b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 11903 -11904  11905 -804 1162 0


c  2-1 --> 1
c    (-b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧ -p_804) -> (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0)
c  in CNF:
c     b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_2
c     b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_1
c     b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨  b^{12, 68}_0
c  in DIMACS:
 11903 -11904  11905  804 -11906 0
 11903 -11904  11905  804 -11907 0
 11903 -11904  11905  804  11908 0

c  1-1 --> 0
c    (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0 ∧ -p_804) -> (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧ -b^{12, 68}_0)
c  in CNF:
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_2
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_1
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_0
c  in DIMACS:
 11903  11904 -11905  804 -11906 0
 11903  11904 -11905  804 -11907 0
 11903  11904 -11905  804 -11908 0

c  0-1 --> -1
c    (-b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧ -p_804) -> ( b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0)
c  in CNF:
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨  b^{12, 68}_2
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_1
c     b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨  b^{12, 68}_0
c  in DIMACS:
 11903  11904  11905  804  11906 0
 11903  11904  11905  804 -11907 0
 11903  11904  11905  804  11908 0

c  -1-1 --> -2
c    ( b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧  b^{12, 67}_0 ∧ -p_804) -> ( b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0)
c  in CNF:
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨  b^{12, 68}_2
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨  b^{12, 68}_1
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨  p_804 ∨ -b^{12, 68}_0
c  in DIMACS:
-11903  11904 -11905  804  11906 0
-11903  11904 -11905  804  11907 0
-11903  11904 -11905  804 -11908 0

c  -2-1 --> break 
c    ( b^{12, 67}_2 ∧  b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨  b^{12, 67}_0 ∨  p_804 ∨ break
c  in DIMACS:
-11903 -11904  11905  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 67}_2 ∧ -b^{12, 67}_1 ∧ -b^{12, 67}_0 ∧ true) 
c  in CNF:
c    -b^{12, 67}_2 ∨  b^{12, 67}_1 ∨  b^{12, 67}_0 ∨ false 
c  in DIMACS:
-11903  11904  11905  0

c  3 does not represent an automaton state.
c    -(-b^{12, 67}_2 ∧  b^{12, 67}_1 ∧  b^{12, 67}_0 ∧ true) 
c  in CNF:
c     b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ false 
c  in DIMACS:
 11903 -11904 -11905  0
c  -3 does not represent an automaton state.
c    -( b^{12, 67}_2 ∧  b^{12, 67}_1 ∧  b^{12, 67}_0 ∧ true) 
c  in CNF:
c    -b^{12, 67}_2 ∨ -b^{12, 67}_1 ∨ -b^{12, 67}_0 ∨ false 
c  in DIMACS:
-11903 -11904 -11905  0

c i = 68
c  -2+1 --> -1
c    ( b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧  p_816) -> ( b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0)
c  in CNF:
c    -b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨  b^{12, 69}_2
c    -b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_1
c    -b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨  b^{12, 69}_0
c  in DIMACS:
-11906 -11907  11908 -816  11909 0
-11906 -11907  11908 -816 -11910 0
-11906 -11907  11908 -816  11911 0

c  -1+1 --> 0
c    ( b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0 ∧  p_816) -> (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧ -b^{12, 69}_0)
c  in CNF:
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_2
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_1
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_0
c  in DIMACS:
-11906  11907 -11908 -816 -11909 0
-11906  11907 -11908 -816 -11910 0
-11906  11907 -11908 -816 -11911 0

c  0+1 --> 1
c    (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧  p_816) -> (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0)
c  in CNF:
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_2
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_1
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨  b^{12, 69}_0
c  in DIMACS:
 11906  11907  11908 -816 -11909 0
 11906  11907  11908 -816 -11910 0
 11906  11907  11908 -816  11911 0

c  1+1 --> 2
c    (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0 ∧  p_816) -> (-b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0)
c  in CNF:
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_2
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨  b^{12, 69}_1
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ -p_816 ∨ -b^{12, 69}_0
c  in DIMACS:
 11906  11907 -11908 -816 -11909 0
 11906  11907 -11908 -816  11910 0
 11906  11907 -11908 -816 -11911 0

c  2+1 --> break 
c    (-b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧  p_816) -> break
c  in CNF:
c     b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 11906 -11907  11908 -816 1162 0


c  2-1 --> 1
c    (-b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧ -p_816) -> (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0)
c  in CNF:
c     b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_2
c     b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_1
c     b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨  b^{12, 69}_0
c  in DIMACS:
 11906 -11907  11908  816 -11909 0
 11906 -11907  11908  816 -11910 0
 11906 -11907  11908  816  11911 0

c  1-1 --> 0
c    (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0 ∧ -p_816) -> (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧ -b^{12, 69}_0)
c  in CNF:
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_2
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_1
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_0
c  in DIMACS:
 11906  11907 -11908  816 -11909 0
 11906  11907 -11908  816 -11910 0
 11906  11907 -11908  816 -11911 0

c  0-1 --> -1
c    (-b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧ -p_816) -> ( b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0)
c  in CNF:
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨  b^{12, 69}_2
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_1
c     b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨  b^{12, 69}_0
c  in DIMACS:
 11906  11907  11908  816  11909 0
 11906  11907  11908  816 -11910 0
 11906  11907  11908  816  11911 0

c  -1-1 --> -2
c    ( b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧  b^{12, 68}_0 ∧ -p_816) -> ( b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0)
c  in CNF:
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨  b^{12, 69}_2
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨  b^{12, 69}_1
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨  p_816 ∨ -b^{12, 69}_0
c  in DIMACS:
-11906  11907 -11908  816  11909 0
-11906  11907 -11908  816  11910 0
-11906  11907 -11908  816 -11911 0

c  -2-1 --> break 
c    ( b^{12, 68}_2 ∧  b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨  b^{12, 68}_0 ∨  p_816 ∨ break
c  in DIMACS:
-11906 -11907  11908  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 68}_2 ∧ -b^{12, 68}_1 ∧ -b^{12, 68}_0 ∧ true) 
c  in CNF:
c    -b^{12, 68}_2 ∨  b^{12, 68}_1 ∨  b^{12, 68}_0 ∨ false 
c  in DIMACS:
-11906  11907  11908  0

c  3 does not represent an automaton state.
c    -(-b^{12, 68}_2 ∧  b^{12, 68}_1 ∧  b^{12, 68}_0 ∧ true) 
c  in CNF:
c     b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ false 
c  in DIMACS:
 11906 -11907 -11908  0
c  -3 does not represent an automaton state.
c    -( b^{12, 68}_2 ∧  b^{12, 68}_1 ∧  b^{12, 68}_0 ∧ true) 
c  in CNF:
c    -b^{12, 68}_2 ∨ -b^{12, 68}_1 ∨ -b^{12, 68}_0 ∨ false 
c  in DIMACS:
-11906 -11907 -11908  0

c i = 69
c  -2+1 --> -1
c    ( b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧  p_828) -> ( b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0)
c  in CNF:
c    -b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨  b^{12, 70}_2
c    -b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_1
c    -b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨  b^{12, 70}_0
c  in DIMACS:
-11909 -11910  11911 -828  11912 0
-11909 -11910  11911 -828 -11913 0
-11909 -11910  11911 -828  11914 0

c  -1+1 --> 0
c    ( b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0 ∧  p_828) -> (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧ -b^{12, 70}_0)
c  in CNF:
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_2
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_1
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_0
c  in DIMACS:
-11909  11910 -11911 -828 -11912 0
-11909  11910 -11911 -828 -11913 0
-11909  11910 -11911 -828 -11914 0

c  0+1 --> 1
c    (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧  p_828) -> (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0)
c  in CNF:
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_2
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_1
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨  b^{12, 70}_0
c  in DIMACS:
 11909  11910  11911 -828 -11912 0
 11909  11910  11911 -828 -11913 0
 11909  11910  11911 -828  11914 0

c  1+1 --> 2
c    (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0 ∧  p_828) -> (-b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0)
c  in CNF:
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_2
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨  b^{12, 70}_1
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ -p_828 ∨ -b^{12, 70}_0
c  in DIMACS:
 11909  11910 -11911 -828 -11912 0
 11909  11910 -11911 -828  11913 0
 11909  11910 -11911 -828 -11914 0

c  2+1 --> break 
c    (-b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧  p_828) -> break
c  in CNF:
c     b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 11909 -11910  11911 -828 1162 0


c  2-1 --> 1
c    (-b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧ -p_828) -> (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0)
c  in CNF:
c     b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_2
c     b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_1
c     b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨  b^{12, 70}_0
c  in DIMACS:
 11909 -11910  11911  828 -11912 0
 11909 -11910  11911  828 -11913 0
 11909 -11910  11911  828  11914 0

c  1-1 --> 0
c    (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0 ∧ -p_828) -> (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧ -b^{12, 70}_0)
c  in CNF:
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_2
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_1
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_0
c  in DIMACS:
 11909  11910 -11911  828 -11912 0
 11909  11910 -11911  828 -11913 0
 11909  11910 -11911  828 -11914 0

c  0-1 --> -1
c    (-b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧ -p_828) -> ( b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0)
c  in CNF:
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨  b^{12, 70}_2
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_1
c     b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨  b^{12, 70}_0
c  in DIMACS:
 11909  11910  11911  828  11912 0
 11909  11910  11911  828 -11913 0
 11909  11910  11911  828  11914 0

c  -1-1 --> -2
c    ( b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧  b^{12, 69}_0 ∧ -p_828) -> ( b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0)
c  in CNF:
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨  b^{12, 70}_2
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨  b^{12, 70}_1
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨  p_828 ∨ -b^{12, 70}_0
c  in DIMACS:
-11909  11910 -11911  828  11912 0
-11909  11910 -11911  828  11913 0
-11909  11910 -11911  828 -11914 0

c  -2-1 --> break 
c    ( b^{12, 69}_2 ∧  b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨  b^{12, 69}_0 ∨  p_828 ∨ break
c  in DIMACS:
-11909 -11910  11911  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 69}_2 ∧ -b^{12, 69}_1 ∧ -b^{12, 69}_0 ∧ true) 
c  in CNF:
c    -b^{12, 69}_2 ∨  b^{12, 69}_1 ∨  b^{12, 69}_0 ∨ false 
c  in DIMACS:
-11909  11910  11911  0

c  3 does not represent an automaton state.
c    -(-b^{12, 69}_2 ∧  b^{12, 69}_1 ∧  b^{12, 69}_0 ∧ true) 
c  in CNF:
c     b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ false 
c  in DIMACS:
 11909 -11910 -11911  0
c  -3 does not represent an automaton state.
c    -( b^{12, 69}_2 ∧  b^{12, 69}_1 ∧  b^{12, 69}_0 ∧ true) 
c  in CNF:
c    -b^{12, 69}_2 ∨ -b^{12, 69}_1 ∨ -b^{12, 69}_0 ∨ false 
c  in DIMACS:
-11909 -11910 -11911  0

c i = 70
c  -2+1 --> -1
c    ( b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧  p_840) -> ( b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0)
c  in CNF:
c    -b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨  b^{12, 71}_2
c    -b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_1
c    -b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨  b^{12, 71}_0
c  in DIMACS:
-11912 -11913  11914 -840  11915 0
-11912 -11913  11914 -840 -11916 0
-11912 -11913  11914 -840  11917 0

c  -1+1 --> 0
c    ( b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0 ∧  p_840) -> (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧ -b^{12, 71}_0)
c  in CNF:
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_2
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_1
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_0
c  in DIMACS:
-11912  11913 -11914 -840 -11915 0
-11912  11913 -11914 -840 -11916 0
-11912  11913 -11914 -840 -11917 0

c  0+1 --> 1
c    (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧  p_840) -> (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0)
c  in CNF:
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_2
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_1
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨  b^{12, 71}_0
c  in DIMACS:
 11912  11913  11914 -840 -11915 0
 11912  11913  11914 -840 -11916 0
 11912  11913  11914 -840  11917 0

c  1+1 --> 2
c    (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0 ∧  p_840) -> (-b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0)
c  in CNF:
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_2
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨  b^{12, 71}_1
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ -p_840 ∨ -b^{12, 71}_0
c  in DIMACS:
 11912  11913 -11914 -840 -11915 0
 11912  11913 -11914 -840  11916 0
 11912  11913 -11914 -840 -11917 0

c  2+1 --> break 
c    (-b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧  p_840) -> break
c  in CNF:
c     b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 11912 -11913  11914 -840 1162 0


c  2-1 --> 1
c    (-b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧ -p_840) -> (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0)
c  in CNF:
c     b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_2
c     b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_1
c     b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨  b^{12, 71}_0
c  in DIMACS:
 11912 -11913  11914  840 -11915 0
 11912 -11913  11914  840 -11916 0
 11912 -11913  11914  840  11917 0

c  1-1 --> 0
c    (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0 ∧ -p_840) -> (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧ -b^{12, 71}_0)
c  in CNF:
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_2
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_1
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_0
c  in DIMACS:
 11912  11913 -11914  840 -11915 0
 11912  11913 -11914  840 -11916 0
 11912  11913 -11914  840 -11917 0

c  0-1 --> -1
c    (-b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧ -p_840) -> ( b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0)
c  in CNF:
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨  b^{12, 71}_2
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_1
c     b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨  b^{12, 71}_0
c  in DIMACS:
 11912  11913  11914  840  11915 0
 11912  11913  11914  840 -11916 0
 11912  11913  11914  840  11917 0

c  -1-1 --> -2
c    ( b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧  b^{12, 70}_0 ∧ -p_840) -> ( b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0)
c  in CNF:
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨  b^{12, 71}_2
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨  b^{12, 71}_1
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨  p_840 ∨ -b^{12, 71}_0
c  in DIMACS:
-11912  11913 -11914  840  11915 0
-11912  11913 -11914  840  11916 0
-11912  11913 -11914  840 -11917 0

c  -2-1 --> break 
c    ( b^{12, 70}_2 ∧  b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨  b^{12, 70}_0 ∨  p_840 ∨ break
c  in DIMACS:
-11912 -11913  11914  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 70}_2 ∧ -b^{12, 70}_1 ∧ -b^{12, 70}_0 ∧ true) 
c  in CNF:
c    -b^{12, 70}_2 ∨  b^{12, 70}_1 ∨  b^{12, 70}_0 ∨ false 
c  in DIMACS:
-11912  11913  11914  0

c  3 does not represent an automaton state.
c    -(-b^{12, 70}_2 ∧  b^{12, 70}_1 ∧  b^{12, 70}_0 ∧ true) 
c  in CNF:
c     b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ false 
c  in DIMACS:
 11912 -11913 -11914  0
c  -3 does not represent an automaton state.
c    -( b^{12, 70}_2 ∧  b^{12, 70}_1 ∧  b^{12, 70}_0 ∧ true) 
c  in CNF:
c    -b^{12, 70}_2 ∨ -b^{12, 70}_1 ∨ -b^{12, 70}_0 ∨ false 
c  in DIMACS:
-11912 -11913 -11914  0

c i = 71
c  -2+1 --> -1
c    ( b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧  p_852) -> ( b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0)
c  in CNF:
c    -b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨  b^{12, 72}_2
c    -b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_1
c    -b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨  b^{12, 72}_0
c  in DIMACS:
-11915 -11916  11917 -852  11918 0
-11915 -11916  11917 -852 -11919 0
-11915 -11916  11917 -852  11920 0

c  -1+1 --> 0
c    ( b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0 ∧  p_852) -> (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧ -b^{12, 72}_0)
c  in CNF:
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_2
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_1
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_0
c  in DIMACS:
-11915  11916 -11917 -852 -11918 0
-11915  11916 -11917 -852 -11919 0
-11915  11916 -11917 -852 -11920 0

c  0+1 --> 1
c    (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧  p_852) -> (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0)
c  in CNF:
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_2
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_1
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨  b^{12, 72}_0
c  in DIMACS:
 11915  11916  11917 -852 -11918 0
 11915  11916  11917 -852 -11919 0
 11915  11916  11917 -852  11920 0

c  1+1 --> 2
c    (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0 ∧  p_852) -> (-b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0)
c  in CNF:
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_2
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨  b^{12, 72}_1
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ -p_852 ∨ -b^{12, 72}_0
c  in DIMACS:
 11915  11916 -11917 -852 -11918 0
 11915  11916 -11917 -852  11919 0
 11915  11916 -11917 -852 -11920 0

c  2+1 --> break 
c    (-b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧  p_852) -> break
c  in CNF:
c     b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 11915 -11916  11917 -852 1162 0


c  2-1 --> 1
c    (-b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧ -p_852) -> (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0)
c  in CNF:
c     b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_2
c     b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_1
c     b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨  b^{12, 72}_0
c  in DIMACS:
 11915 -11916  11917  852 -11918 0
 11915 -11916  11917  852 -11919 0
 11915 -11916  11917  852  11920 0

c  1-1 --> 0
c    (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0 ∧ -p_852) -> (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧ -b^{12, 72}_0)
c  in CNF:
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_2
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_1
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_0
c  in DIMACS:
 11915  11916 -11917  852 -11918 0
 11915  11916 -11917  852 -11919 0
 11915  11916 -11917  852 -11920 0

c  0-1 --> -1
c    (-b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧ -p_852) -> ( b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0)
c  in CNF:
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨  b^{12, 72}_2
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_1
c     b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨  b^{12, 72}_0
c  in DIMACS:
 11915  11916  11917  852  11918 0
 11915  11916  11917  852 -11919 0
 11915  11916  11917  852  11920 0

c  -1-1 --> -2
c    ( b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧  b^{12, 71}_0 ∧ -p_852) -> ( b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0)
c  in CNF:
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨  b^{12, 72}_2
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨  b^{12, 72}_1
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨  p_852 ∨ -b^{12, 72}_0
c  in DIMACS:
-11915  11916 -11917  852  11918 0
-11915  11916 -11917  852  11919 0
-11915  11916 -11917  852 -11920 0

c  -2-1 --> break 
c    ( b^{12, 71}_2 ∧  b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨  b^{12, 71}_0 ∨  p_852 ∨ break
c  in DIMACS:
-11915 -11916  11917  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 71}_2 ∧ -b^{12, 71}_1 ∧ -b^{12, 71}_0 ∧ true) 
c  in CNF:
c    -b^{12, 71}_2 ∨  b^{12, 71}_1 ∨  b^{12, 71}_0 ∨ false 
c  in DIMACS:
-11915  11916  11917  0

c  3 does not represent an automaton state.
c    -(-b^{12, 71}_2 ∧  b^{12, 71}_1 ∧  b^{12, 71}_0 ∧ true) 
c  in CNF:
c     b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ false 
c  in DIMACS:
 11915 -11916 -11917  0
c  -3 does not represent an automaton state.
c    -( b^{12, 71}_2 ∧  b^{12, 71}_1 ∧  b^{12, 71}_0 ∧ true) 
c  in CNF:
c    -b^{12, 71}_2 ∨ -b^{12, 71}_1 ∨ -b^{12, 71}_0 ∨ false 
c  in DIMACS:
-11915 -11916 -11917  0

c i = 72
c  -2+1 --> -1
c    ( b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧  p_864) -> ( b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0)
c  in CNF:
c    -b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨  b^{12, 73}_2
c    -b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_1
c    -b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨  b^{12, 73}_0
c  in DIMACS:
-11918 -11919  11920 -864  11921 0
-11918 -11919  11920 -864 -11922 0
-11918 -11919  11920 -864  11923 0

c  -1+1 --> 0
c    ( b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0 ∧  p_864) -> (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧ -b^{12, 73}_0)
c  in CNF:
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_2
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_1
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_0
c  in DIMACS:
-11918  11919 -11920 -864 -11921 0
-11918  11919 -11920 -864 -11922 0
-11918  11919 -11920 -864 -11923 0

c  0+1 --> 1
c    (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧  p_864) -> (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0)
c  in CNF:
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_2
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_1
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨  b^{12, 73}_0
c  in DIMACS:
 11918  11919  11920 -864 -11921 0
 11918  11919  11920 -864 -11922 0
 11918  11919  11920 -864  11923 0

c  1+1 --> 2
c    (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0 ∧  p_864) -> (-b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0)
c  in CNF:
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_2
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨  b^{12, 73}_1
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ -p_864 ∨ -b^{12, 73}_0
c  in DIMACS:
 11918  11919 -11920 -864 -11921 0
 11918  11919 -11920 -864  11922 0
 11918  11919 -11920 -864 -11923 0

c  2+1 --> break 
c    (-b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧  p_864) -> break
c  in CNF:
c     b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 11918 -11919  11920 -864 1162 0


c  2-1 --> 1
c    (-b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧ -p_864) -> (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0)
c  in CNF:
c     b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_2
c     b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_1
c     b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨  b^{12, 73}_0
c  in DIMACS:
 11918 -11919  11920  864 -11921 0
 11918 -11919  11920  864 -11922 0
 11918 -11919  11920  864  11923 0

c  1-1 --> 0
c    (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0 ∧ -p_864) -> (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧ -b^{12, 73}_0)
c  in CNF:
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_2
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_1
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_0
c  in DIMACS:
 11918  11919 -11920  864 -11921 0
 11918  11919 -11920  864 -11922 0
 11918  11919 -11920  864 -11923 0

c  0-1 --> -1
c    (-b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧ -p_864) -> ( b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0)
c  in CNF:
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨  b^{12, 73}_2
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_1
c     b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨  b^{12, 73}_0
c  in DIMACS:
 11918  11919  11920  864  11921 0
 11918  11919  11920  864 -11922 0
 11918  11919  11920  864  11923 0

c  -1-1 --> -2
c    ( b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧  b^{12, 72}_0 ∧ -p_864) -> ( b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0)
c  in CNF:
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨  b^{12, 73}_2
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨  b^{12, 73}_1
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨  p_864 ∨ -b^{12, 73}_0
c  in DIMACS:
-11918  11919 -11920  864  11921 0
-11918  11919 -11920  864  11922 0
-11918  11919 -11920  864 -11923 0

c  -2-1 --> break 
c    ( b^{12, 72}_2 ∧  b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨  b^{12, 72}_0 ∨  p_864 ∨ break
c  in DIMACS:
-11918 -11919  11920  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 72}_2 ∧ -b^{12, 72}_1 ∧ -b^{12, 72}_0 ∧ true) 
c  in CNF:
c    -b^{12, 72}_2 ∨  b^{12, 72}_1 ∨  b^{12, 72}_0 ∨ false 
c  in DIMACS:
-11918  11919  11920  0

c  3 does not represent an automaton state.
c    -(-b^{12, 72}_2 ∧  b^{12, 72}_1 ∧  b^{12, 72}_0 ∧ true) 
c  in CNF:
c     b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ false 
c  in DIMACS:
 11918 -11919 -11920  0
c  -3 does not represent an automaton state.
c    -( b^{12, 72}_2 ∧  b^{12, 72}_1 ∧  b^{12, 72}_0 ∧ true) 
c  in CNF:
c    -b^{12, 72}_2 ∨ -b^{12, 72}_1 ∨ -b^{12, 72}_0 ∨ false 
c  in DIMACS:
-11918 -11919 -11920  0

c i = 73
c  -2+1 --> -1
c    ( b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧  p_876) -> ( b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0)
c  in CNF:
c    -b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨  b^{12, 74}_2
c    -b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_1
c    -b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨  b^{12, 74}_0
c  in DIMACS:
-11921 -11922  11923 -876  11924 0
-11921 -11922  11923 -876 -11925 0
-11921 -11922  11923 -876  11926 0

c  -1+1 --> 0
c    ( b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0 ∧  p_876) -> (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧ -b^{12, 74}_0)
c  in CNF:
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_2
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_1
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_0
c  in DIMACS:
-11921  11922 -11923 -876 -11924 0
-11921  11922 -11923 -876 -11925 0
-11921  11922 -11923 -876 -11926 0

c  0+1 --> 1
c    (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧  p_876) -> (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0)
c  in CNF:
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_2
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_1
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨  b^{12, 74}_0
c  in DIMACS:
 11921  11922  11923 -876 -11924 0
 11921  11922  11923 -876 -11925 0
 11921  11922  11923 -876  11926 0

c  1+1 --> 2
c    (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0 ∧  p_876) -> (-b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0)
c  in CNF:
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_2
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨  b^{12, 74}_1
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ -p_876 ∨ -b^{12, 74}_0
c  in DIMACS:
 11921  11922 -11923 -876 -11924 0
 11921  11922 -11923 -876  11925 0
 11921  11922 -11923 -876 -11926 0

c  2+1 --> break 
c    (-b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧  p_876) -> break
c  in CNF:
c     b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 11921 -11922  11923 -876 1162 0


c  2-1 --> 1
c    (-b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧ -p_876) -> (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0)
c  in CNF:
c     b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_2
c     b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_1
c     b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨  b^{12, 74}_0
c  in DIMACS:
 11921 -11922  11923  876 -11924 0
 11921 -11922  11923  876 -11925 0
 11921 -11922  11923  876  11926 0

c  1-1 --> 0
c    (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0 ∧ -p_876) -> (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧ -b^{12, 74}_0)
c  in CNF:
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_2
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_1
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_0
c  in DIMACS:
 11921  11922 -11923  876 -11924 0
 11921  11922 -11923  876 -11925 0
 11921  11922 -11923  876 -11926 0

c  0-1 --> -1
c    (-b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧ -p_876) -> ( b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0)
c  in CNF:
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨  b^{12, 74}_2
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_1
c     b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨  b^{12, 74}_0
c  in DIMACS:
 11921  11922  11923  876  11924 0
 11921  11922  11923  876 -11925 0
 11921  11922  11923  876  11926 0

c  -1-1 --> -2
c    ( b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧  b^{12, 73}_0 ∧ -p_876) -> ( b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0)
c  in CNF:
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨  b^{12, 74}_2
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨  b^{12, 74}_1
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨  p_876 ∨ -b^{12, 74}_0
c  in DIMACS:
-11921  11922 -11923  876  11924 0
-11921  11922 -11923  876  11925 0
-11921  11922 -11923  876 -11926 0

c  -2-1 --> break 
c    ( b^{12, 73}_2 ∧  b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨  b^{12, 73}_0 ∨  p_876 ∨ break
c  in DIMACS:
-11921 -11922  11923  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 73}_2 ∧ -b^{12, 73}_1 ∧ -b^{12, 73}_0 ∧ true) 
c  in CNF:
c    -b^{12, 73}_2 ∨  b^{12, 73}_1 ∨  b^{12, 73}_0 ∨ false 
c  in DIMACS:
-11921  11922  11923  0

c  3 does not represent an automaton state.
c    -(-b^{12, 73}_2 ∧  b^{12, 73}_1 ∧  b^{12, 73}_0 ∧ true) 
c  in CNF:
c     b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ false 
c  in DIMACS:
 11921 -11922 -11923  0
c  -3 does not represent an automaton state.
c    -( b^{12, 73}_2 ∧  b^{12, 73}_1 ∧  b^{12, 73}_0 ∧ true) 
c  in CNF:
c    -b^{12, 73}_2 ∨ -b^{12, 73}_1 ∨ -b^{12, 73}_0 ∨ false 
c  in DIMACS:
-11921 -11922 -11923  0

c i = 74
c  -2+1 --> -1
c    ( b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧  p_888) -> ( b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0)
c  in CNF:
c    -b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨  b^{12, 75}_2
c    -b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_1
c    -b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨  b^{12, 75}_0
c  in DIMACS:
-11924 -11925  11926 -888  11927 0
-11924 -11925  11926 -888 -11928 0
-11924 -11925  11926 -888  11929 0

c  -1+1 --> 0
c    ( b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0 ∧  p_888) -> (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧ -b^{12, 75}_0)
c  in CNF:
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_2
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_1
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_0
c  in DIMACS:
-11924  11925 -11926 -888 -11927 0
-11924  11925 -11926 -888 -11928 0
-11924  11925 -11926 -888 -11929 0

c  0+1 --> 1
c    (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧  p_888) -> (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0)
c  in CNF:
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_2
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_1
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨  b^{12, 75}_0
c  in DIMACS:
 11924  11925  11926 -888 -11927 0
 11924  11925  11926 -888 -11928 0
 11924  11925  11926 -888  11929 0

c  1+1 --> 2
c    (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0 ∧  p_888) -> (-b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0)
c  in CNF:
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_2
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨  b^{12, 75}_1
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ -p_888 ∨ -b^{12, 75}_0
c  in DIMACS:
 11924  11925 -11926 -888 -11927 0
 11924  11925 -11926 -888  11928 0
 11924  11925 -11926 -888 -11929 0

c  2+1 --> break 
c    (-b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧  p_888) -> break
c  in CNF:
c     b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 11924 -11925  11926 -888 1162 0


c  2-1 --> 1
c    (-b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧ -p_888) -> (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0)
c  in CNF:
c     b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_2
c     b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_1
c     b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨  b^{12, 75}_0
c  in DIMACS:
 11924 -11925  11926  888 -11927 0
 11924 -11925  11926  888 -11928 0
 11924 -11925  11926  888  11929 0

c  1-1 --> 0
c    (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0 ∧ -p_888) -> (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧ -b^{12, 75}_0)
c  in CNF:
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_2
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_1
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_0
c  in DIMACS:
 11924  11925 -11926  888 -11927 0
 11924  11925 -11926  888 -11928 0
 11924  11925 -11926  888 -11929 0

c  0-1 --> -1
c    (-b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧ -p_888) -> ( b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0)
c  in CNF:
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨  b^{12, 75}_2
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_1
c     b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨  b^{12, 75}_0
c  in DIMACS:
 11924  11925  11926  888  11927 0
 11924  11925  11926  888 -11928 0
 11924  11925  11926  888  11929 0

c  -1-1 --> -2
c    ( b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧  b^{12, 74}_0 ∧ -p_888) -> ( b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0)
c  in CNF:
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨  b^{12, 75}_2
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨  b^{12, 75}_1
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨  p_888 ∨ -b^{12, 75}_0
c  in DIMACS:
-11924  11925 -11926  888  11927 0
-11924  11925 -11926  888  11928 0
-11924  11925 -11926  888 -11929 0

c  -2-1 --> break 
c    ( b^{12, 74}_2 ∧  b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨  b^{12, 74}_0 ∨  p_888 ∨ break
c  in DIMACS:
-11924 -11925  11926  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 74}_2 ∧ -b^{12, 74}_1 ∧ -b^{12, 74}_0 ∧ true) 
c  in CNF:
c    -b^{12, 74}_2 ∨  b^{12, 74}_1 ∨  b^{12, 74}_0 ∨ false 
c  in DIMACS:
-11924  11925  11926  0

c  3 does not represent an automaton state.
c    -(-b^{12, 74}_2 ∧  b^{12, 74}_1 ∧  b^{12, 74}_0 ∧ true) 
c  in CNF:
c     b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ false 
c  in DIMACS:
 11924 -11925 -11926  0
c  -3 does not represent an automaton state.
c    -( b^{12, 74}_2 ∧  b^{12, 74}_1 ∧  b^{12, 74}_0 ∧ true) 
c  in CNF:
c    -b^{12, 74}_2 ∨ -b^{12, 74}_1 ∨ -b^{12, 74}_0 ∨ false 
c  in DIMACS:
-11924 -11925 -11926  0

c i = 75
c  -2+1 --> -1
c    ( b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧  p_900) -> ( b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0)
c  in CNF:
c    -b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨  b^{12, 76}_2
c    -b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_1
c    -b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨  b^{12, 76}_0
c  in DIMACS:
-11927 -11928  11929 -900  11930 0
-11927 -11928  11929 -900 -11931 0
-11927 -11928  11929 -900  11932 0

c  -1+1 --> 0
c    ( b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0 ∧  p_900) -> (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧ -b^{12, 76}_0)
c  in CNF:
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_2
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_1
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_0
c  in DIMACS:
-11927  11928 -11929 -900 -11930 0
-11927  11928 -11929 -900 -11931 0
-11927  11928 -11929 -900 -11932 0

c  0+1 --> 1
c    (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧  p_900) -> (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0)
c  in CNF:
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_2
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_1
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨  b^{12, 76}_0
c  in DIMACS:
 11927  11928  11929 -900 -11930 0
 11927  11928  11929 -900 -11931 0
 11927  11928  11929 -900  11932 0

c  1+1 --> 2
c    (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0 ∧  p_900) -> (-b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0)
c  in CNF:
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_2
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨  b^{12, 76}_1
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ -p_900 ∨ -b^{12, 76}_0
c  in DIMACS:
 11927  11928 -11929 -900 -11930 0
 11927  11928 -11929 -900  11931 0
 11927  11928 -11929 -900 -11932 0

c  2+1 --> break 
c    (-b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧  p_900) -> break
c  in CNF:
c     b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 11927 -11928  11929 -900 1162 0


c  2-1 --> 1
c    (-b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧ -p_900) -> (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0)
c  in CNF:
c     b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_2
c     b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_1
c     b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨  b^{12, 76}_0
c  in DIMACS:
 11927 -11928  11929  900 -11930 0
 11927 -11928  11929  900 -11931 0
 11927 -11928  11929  900  11932 0

c  1-1 --> 0
c    (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0 ∧ -p_900) -> (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧ -b^{12, 76}_0)
c  in CNF:
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_2
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_1
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_0
c  in DIMACS:
 11927  11928 -11929  900 -11930 0
 11927  11928 -11929  900 -11931 0
 11927  11928 -11929  900 -11932 0

c  0-1 --> -1
c    (-b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧ -p_900) -> ( b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0)
c  in CNF:
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨  b^{12, 76}_2
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_1
c     b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨  b^{12, 76}_0
c  in DIMACS:
 11927  11928  11929  900  11930 0
 11927  11928  11929  900 -11931 0
 11927  11928  11929  900  11932 0

c  -1-1 --> -2
c    ( b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧  b^{12, 75}_0 ∧ -p_900) -> ( b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0)
c  in CNF:
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨  b^{12, 76}_2
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨  b^{12, 76}_1
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨  p_900 ∨ -b^{12, 76}_0
c  in DIMACS:
-11927  11928 -11929  900  11930 0
-11927  11928 -11929  900  11931 0
-11927  11928 -11929  900 -11932 0

c  -2-1 --> break 
c    ( b^{12, 75}_2 ∧  b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨  b^{12, 75}_0 ∨  p_900 ∨ break
c  in DIMACS:
-11927 -11928  11929  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 75}_2 ∧ -b^{12, 75}_1 ∧ -b^{12, 75}_0 ∧ true) 
c  in CNF:
c    -b^{12, 75}_2 ∨  b^{12, 75}_1 ∨  b^{12, 75}_0 ∨ false 
c  in DIMACS:
-11927  11928  11929  0

c  3 does not represent an automaton state.
c    -(-b^{12, 75}_2 ∧  b^{12, 75}_1 ∧  b^{12, 75}_0 ∧ true) 
c  in CNF:
c     b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ false 
c  in DIMACS:
 11927 -11928 -11929  0
c  -3 does not represent an automaton state.
c    -( b^{12, 75}_2 ∧  b^{12, 75}_1 ∧  b^{12, 75}_0 ∧ true) 
c  in CNF:
c    -b^{12, 75}_2 ∨ -b^{12, 75}_1 ∨ -b^{12, 75}_0 ∨ false 
c  in DIMACS:
-11927 -11928 -11929  0

c i = 76
c  -2+1 --> -1
c    ( b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧  p_912) -> ( b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0)
c  in CNF:
c    -b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨  b^{12, 77}_2
c    -b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_1
c    -b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨  b^{12, 77}_0
c  in DIMACS:
-11930 -11931  11932 -912  11933 0
-11930 -11931  11932 -912 -11934 0
-11930 -11931  11932 -912  11935 0

c  -1+1 --> 0
c    ( b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0 ∧  p_912) -> (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧ -b^{12, 77}_0)
c  in CNF:
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_2
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_1
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_0
c  in DIMACS:
-11930  11931 -11932 -912 -11933 0
-11930  11931 -11932 -912 -11934 0
-11930  11931 -11932 -912 -11935 0

c  0+1 --> 1
c    (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧  p_912) -> (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0)
c  in CNF:
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_2
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_1
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨  b^{12, 77}_0
c  in DIMACS:
 11930  11931  11932 -912 -11933 0
 11930  11931  11932 -912 -11934 0
 11930  11931  11932 -912  11935 0

c  1+1 --> 2
c    (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0 ∧  p_912) -> (-b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0)
c  in CNF:
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_2
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨  b^{12, 77}_1
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ -p_912 ∨ -b^{12, 77}_0
c  in DIMACS:
 11930  11931 -11932 -912 -11933 0
 11930  11931 -11932 -912  11934 0
 11930  11931 -11932 -912 -11935 0

c  2+1 --> break 
c    (-b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧  p_912) -> break
c  in CNF:
c     b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 11930 -11931  11932 -912 1162 0


c  2-1 --> 1
c    (-b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧ -p_912) -> (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0)
c  in CNF:
c     b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_2
c     b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_1
c     b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨  b^{12, 77}_0
c  in DIMACS:
 11930 -11931  11932  912 -11933 0
 11930 -11931  11932  912 -11934 0
 11930 -11931  11932  912  11935 0

c  1-1 --> 0
c    (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0 ∧ -p_912) -> (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧ -b^{12, 77}_0)
c  in CNF:
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_2
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_1
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_0
c  in DIMACS:
 11930  11931 -11932  912 -11933 0
 11930  11931 -11932  912 -11934 0
 11930  11931 -11932  912 -11935 0

c  0-1 --> -1
c    (-b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧ -p_912) -> ( b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0)
c  in CNF:
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨  b^{12, 77}_2
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_1
c     b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨  b^{12, 77}_0
c  in DIMACS:
 11930  11931  11932  912  11933 0
 11930  11931  11932  912 -11934 0
 11930  11931  11932  912  11935 0

c  -1-1 --> -2
c    ( b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧  b^{12, 76}_0 ∧ -p_912) -> ( b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0)
c  in CNF:
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨  b^{12, 77}_2
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨  b^{12, 77}_1
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨  p_912 ∨ -b^{12, 77}_0
c  in DIMACS:
-11930  11931 -11932  912  11933 0
-11930  11931 -11932  912  11934 0
-11930  11931 -11932  912 -11935 0

c  -2-1 --> break 
c    ( b^{12, 76}_2 ∧  b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨  b^{12, 76}_0 ∨  p_912 ∨ break
c  in DIMACS:
-11930 -11931  11932  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 76}_2 ∧ -b^{12, 76}_1 ∧ -b^{12, 76}_0 ∧ true) 
c  in CNF:
c    -b^{12, 76}_2 ∨  b^{12, 76}_1 ∨  b^{12, 76}_0 ∨ false 
c  in DIMACS:
-11930  11931  11932  0

c  3 does not represent an automaton state.
c    -(-b^{12, 76}_2 ∧  b^{12, 76}_1 ∧  b^{12, 76}_0 ∧ true) 
c  in CNF:
c     b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ false 
c  in DIMACS:
 11930 -11931 -11932  0
c  -3 does not represent an automaton state.
c    -( b^{12, 76}_2 ∧  b^{12, 76}_1 ∧  b^{12, 76}_0 ∧ true) 
c  in CNF:
c    -b^{12, 76}_2 ∨ -b^{12, 76}_1 ∨ -b^{12, 76}_0 ∨ false 
c  in DIMACS:
-11930 -11931 -11932  0

c i = 77
c  -2+1 --> -1
c    ( b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧  p_924) -> ( b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0)
c  in CNF:
c    -b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨  b^{12, 78}_2
c    -b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_1
c    -b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨  b^{12, 78}_0
c  in DIMACS:
-11933 -11934  11935 -924  11936 0
-11933 -11934  11935 -924 -11937 0
-11933 -11934  11935 -924  11938 0

c  -1+1 --> 0
c    ( b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0 ∧  p_924) -> (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧ -b^{12, 78}_0)
c  in CNF:
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_2
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_1
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_0
c  in DIMACS:
-11933  11934 -11935 -924 -11936 0
-11933  11934 -11935 -924 -11937 0
-11933  11934 -11935 -924 -11938 0

c  0+1 --> 1
c    (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧  p_924) -> (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0)
c  in CNF:
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_2
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_1
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨  b^{12, 78}_0
c  in DIMACS:
 11933  11934  11935 -924 -11936 0
 11933  11934  11935 -924 -11937 0
 11933  11934  11935 -924  11938 0

c  1+1 --> 2
c    (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0 ∧  p_924) -> (-b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0)
c  in CNF:
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_2
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨  b^{12, 78}_1
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ -p_924 ∨ -b^{12, 78}_0
c  in DIMACS:
 11933  11934 -11935 -924 -11936 0
 11933  11934 -11935 -924  11937 0
 11933  11934 -11935 -924 -11938 0

c  2+1 --> break 
c    (-b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧  p_924) -> break
c  in CNF:
c     b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 11933 -11934  11935 -924 1162 0


c  2-1 --> 1
c    (-b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧ -p_924) -> (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0)
c  in CNF:
c     b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_2
c     b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_1
c     b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨  b^{12, 78}_0
c  in DIMACS:
 11933 -11934  11935  924 -11936 0
 11933 -11934  11935  924 -11937 0
 11933 -11934  11935  924  11938 0

c  1-1 --> 0
c    (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0 ∧ -p_924) -> (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧ -b^{12, 78}_0)
c  in CNF:
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_2
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_1
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_0
c  in DIMACS:
 11933  11934 -11935  924 -11936 0
 11933  11934 -11935  924 -11937 0
 11933  11934 -11935  924 -11938 0

c  0-1 --> -1
c    (-b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧ -p_924) -> ( b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0)
c  in CNF:
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨  b^{12, 78}_2
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_1
c     b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨  b^{12, 78}_0
c  in DIMACS:
 11933  11934  11935  924  11936 0
 11933  11934  11935  924 -11937 0
 11933  11934  11935  924  11938 0

c  -1-1 --> -2
c    ( b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧  b^{12, 77}_0 ∧ -p_924) -> ( b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0)
c  in CNF:
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨  b^{12, 78}_2
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨  b^{12, 78}_1
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨  p_924 ∨ -b^{12, 78}_0
c  in DIMACS:
-11933  11934 -11935  924  11936 0
-11933  11934 -11935  924  11937 0
-11933  11934 -11935  924 -11938 0

c  -2-1 --> break 
c    ( b^{12, 77}_2 ∧  b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨  b^{12, 77}_0 ∨  p_924 ∨ break
c  in DIMACS:
-11933 -11934  11935  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 77}_2 ∧ -b^{12, 77}_1 ∧ -b^{12, 77}_0 ∧ true) 
c  in CNF:
c    -b^{12, 77}_2 ∨  b^{12, 77}_1 ∨  b^{12, 77}_0 ∨ false 
c  in DIMACS:
-11933  11934  11935  0

c  3 does not represent an automaton state.
c    -(-b^{12, 77}_2 ∧  b^{12, 77}_1 ∧  b^{12, 77}_0 ∧ true) 
c  in CNF:
c     b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ false 
c  in DIMACS:
 11933 -11934 -11935  0
c  -3 does not represent an automaton state.
c    -( b^{12, 77}_2 ∧  b^{12, 77}_1 ∧  b^{12, 77}_0 ∧ true) 
c  in CNF:
c    -b^{12, 77}_2 ∨ -b^{12, 77}_1 ∨ -b^{12, 77}_0 ∨ false 
c  in DIMACS:
-11933 -11934 -11935  0

c i = 78
c  -2+1 --> -1
c    ( b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧  p_936) -> ( b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0)
c  in CNF:
c    -b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨  b^{12, 79}_2
c    -b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_1
c    -b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨  b^{12, 79}_0
c  in DIMACS:
-11936 -11937  11938 -936  11939 0
-11936 -11937  11938 -936 -11940 0
-11936 -11937  11938 -936  11941 0

c  -1+1 --> 0
c    ( b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0 ∧  p_936) -> (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧ -b^{12, 79}_0)
c  in CNF:
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_2
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_1
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_0
c  in DIMACS:
-11936  11937 -11938 -936 -11939 0
-11936  11937 -11938 -936 -11940 0
-11936  11937 -11938 -936 -11941 0

c  0+1 --> 1
c    (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧  p_936) -> (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0)
c  in CNF:
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_2
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_1
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨  b^{12, 79}_0
c  in DIMACS:
 11936  11937  11938 -936 -11939 0
 11936  11937  11938 -936 -11940 0
 11936  11937  11938 -936  11941 0

c  1+1 --> 2
c    (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0 ∧  p_936) -> (-b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0)
c  in CNF:
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_2
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨  b^{12, 79}_1
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ -p_936 ∨ -b^{12, 79}_0
c  in DIMACS:
 11936  11937 -11938 -936 -11939 0
 11936  11937 -11938 -936  11940 0
 11936  11937 -11938 -936 -11941 0

c  2+1 --> break 
c    (-b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧  p_936) -> break
c  in CNF:
c     b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 11936 -11937  11938 -936 1162 0


c  2-1 --> 1
c    (-b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧ -p_936) -> (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0)
c  in CNF:
c     b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_2
c     b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_1
c     b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨  b^{12, 79}_0
c  in DIMACS:
 11936 -11937  11938  936 -11939 0
 11936 -11937  11938  936 -11940 0
 11936 -11937  11938  936  11941 0

c  1-1 --> 0
c    (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0 ∧ -p_936) -> (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧ -b^{12, 79}_0)
c  in CNF:
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_2
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_1
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_0
c  in DIMACS:
 11936  11937 -11938  936 -11939 0
 11936  11937 -11938  936 -11940 0
 11936  11937 -11938  936 -11941 0

c  0-1 --> -1
c    (-b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧ -p_936) -> ( b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0)
c  in CNF:
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨  b^{12, 79}_2
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_1
c     b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨  b^{12, 79}_0
c  in DIMACS:
 11936  11937  11938  936  11939 0
 11936  11937  11938  936 -11940 0
 11936  11937  11938  936  11941 0

c  -1-1 --> -2
c    ( b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧  b^{12, 78}_0 ∧ -p_936) -> ( b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0)
c  in CNF:
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨  b^{12, 79}_2
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨  b^{12, 79}_1
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨  p_936 ∨ -b^{12, 79}_0
c  in DIMACS:
-11936  11937 -11938  936  11939 0
-11936  11937 -11938  936  11940 0
-11936  11937 -11938  936 -11941 0

c  -2-1 --> break 
c    ( b^{12, 78}_2 ∧  b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨  b^{12, 78}_0 ∨  p_936 ∨ break
c  in DIMACS:
-11936 -11937  11938  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 78}_2 ∧ -b^{12, 78}_1 ∧ -b^{12, 78}_0 ∧ true) 
c  in CNF:
c    -b^{12, 78}_2 ∨  b^{12, 78}_1 ∨  b^{12, 78}_0 ∨ false 
c  in DIMACS:
-11936  11937  11938  0

c  3 does not represent an automaton state.
c    -(-b^{12, 78}_2 ∧  b^{12, 78}_1 ∧  b^{12, 78}_0 ∧ true) 
c  in CNF:
c     b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ false 
c  in DIMACS:
 11936 -11937 -11938  0
c  -3 does not represent an automaton state.
c    -( b^{12, 78}_2 ∧  b^{12, 78}_1 ∧  b^{12, 78}_0 ∧ true) 
c  in CNF:
c    -b^{12, 78}_2 ∨ -b^{12, 78}_1 ∨ -b^{12, 78}_0 ∨ false 
c  in DIMACS:
-11936 -11937 -11938  0

c i = 79
c  -2+1 --> -1
c    ( b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧  p_948) -> ( b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0)
c  in CNF:
c    -b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨  b^{12, 80}_2
c    -b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_1
c    -b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨  b^{12, 80}_0
c  in DIMACS:
-11939 -11940  11941 -948  11942 0
-11939 -11940  11941 -948 -11943 0
-11939 -11940  11941 -948  11944 0

c  -1+1 --> 0
c    ( b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0 ∧  p_948) -> (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧ -b^{12, 80}_0)
c  in CNF:
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_2
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_1
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_0
c  in DIMACS:
-11939  11940 -11941 -948 -11942 0
-11939  11940 -11941 -948 -11943 0
-11939  11940 -11941 -948 -11944 0

c  0+1 --> 1
c    (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧  p_948) -> (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0)
c  in CNF:
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_2
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_1
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨  b^{12, 80}_0
c  in DIMACS:
 11939  11940  11941 -948 -11942 0
 11939  11940  11941 -948 -11943 0
 11939  11940  11941 -948  11944 0

c  1+1 --> 2
c    (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0 ∧  p_948) -> (-b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0)
c  in CNF:
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_2
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨  b^{12, 80}_1
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ -p_948 ∨ -b^{12, 80}_0
c  in DIMACS:
 11939  11940 -11941 -948 -11942 0
 11939  11940 -11941 -948  11943 0
 11939  11940 -11941 -948 -11944 0

c  2+1 --> break 
c    (-b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧  p_948) -> break
c  in CNF:
c     b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 11939 -11940  11941 -948 1162 0


c  2-1 --> 1
c    (-b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧ -p_948) -> (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0)
c  in CNF:
c     b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_2
c     b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_1
c     b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨  b^{12, 80}_0
c  in DIMACS:
 11939 -11940  11941  948 -11942 0
 11939 -11940  11941  948 -11943 0
 11939 -11940  11941  948  11944 0

c  1-1 --> 0
c    (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0 ∧ -p_948) -> (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧ -b^{12, 80}_0)
c  in CNF:
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_2
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_1
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_0
c  in DIMACS:
 11939  11940 -11941  948 -11942 0
 11939  11940 -11941  948 -11943 0
 11939  11940 -11941  948 -11944 0

c  0-1 --> -1
c    (-b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧ -p_948) -> ( b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0)
c  in CNF:
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨  b^{12, 80}_2
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_1
c     b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨  b^{12, 80}_0
c  in DIMACS:
 11939  11940  11941  948  11942 0
 11939  11940  11941  948 -11943 0
 11939  11940  11941  948  11944 0

c  -1-1 --> -2
c    ( b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧  b^{12, 79}_0 ∧ -p_948) -> ( b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0)
c  in CNF:
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨  b^{12, 80}_2
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨  b^{12, 80}_1
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨  p_948 ∨ -b^{12, 80}_0
c  in DIMACS:
-11939  11940 -11941  948  11942 0
-11939  11940 -11941  948  11943 0
-11939  11940 -11941  948 -11944 0

c  -2-1 --> break 
c    ( b^{12, 79}_2 ∧  b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨  b^{12, 79}_0 ∨  p_948 ∨ break
c  in DIMACS:
-11939 -11940  11941  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 79}_2 ∧ -b^{12, 79}_1 ∧ -b^{12, 79}_0 ∧ true) 
c  in CNF:
c    -b^{12, 79}_2 ∨  b^{12, 79}_1 ∨  b^{12, 79}_0 ∨ false 
c  in DIMACS:
-11939  11940  11941  0

c  3 does not represent an automaton state.
c    -(-b^{12, 79}_2 ∧  b^{12, 79}_1 ∧  b^{12, 79}_0 ∧ true) 
c  in CNF:
c     b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ false 
c  in DIMACS:
 11939 -11940 -11941  0
c  -3 does not represent an automaton state.
c    -( b^{12, 79}_2 ∧  b^{12, 79}_1 ∧  b^{12, 79}_0 ∧ true) 
c  in CNF:
c    -b^{12, 79}_2 ∨ -b^{12, 79}_1 ∨ -b^{12, 79}_0 ∨ false 
c  in DIMACS:
-11939 -11940 -11941  0

c i = 80
c  -2+1 --> -1
c    ( b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧  p_960) -> ( b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0)
c  in CNF:
c    -b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨  b^{12, 81}_2
c    -b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_1
c    -b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨  b^{12, 81}_0
c  in DIMACS:
-11942 -11943  11944 -960  11945 0
-11942 -11943  11944 -960 -11946 0
-11942 -11943  11944 -960  11947 0

c  -1+1 --> 0
c    ( b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0 ∧  p_960) -> (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧ -b^{12, 81}_0)
c  in CNF:
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_2
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_1
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_0
c  in DIMACS:
-11942  11943 -11944 -960 -11945 0
-11942  11943 -11944 -960 -11946 0
-11942  11943 -11944 -960 -11947 0

c  0+1 --> 1
c    (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧  p_960) -> (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0)
c  in CNF:
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_2
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_1
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨  b^{12, 81}_0
c  in DIMACS:
 11942  11943  11944 -960 -11945 0
 11942  11943  11944 -960 -11946 0
 11942  11943  11944 -960  11947 0

c  1+1 --> 2
c    (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0 ∧  p_960) -> (-b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0)
c  in CNF:
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_2
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨  b^{12, 81}_1
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ -p_960 ∨ -b^{12, 81}_0
c  in DIMACS:
 11942  11943 -11944 -960 -11945 0
 11942  11943 -11944 -960  11946 0
 11942  11943 -11944 -960 -11947 0

c  2+1 --> break 
c    (-b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧  p_960) -> break
c  in CNF:
c     b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 11942 -11943  11944 -960 1162 0


c  2-1 --> 1
c    (-b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧ -p_960) -> (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0)
c  in CNF:
c     b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_2
c     b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_1
c     b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨  b^{12, 81}_0
c  in DIMACS:
 11942 -11943  11944  960 -11945 0
 11942 -11943  11944  960 -11946 0
 11942 -11943  11944  960  11947 0

c  1-1 --> 0
c    (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0 ∧ -p_960) -> (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧ -b^{12, 81}_0)
c  in CNF:
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_2
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_1
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_0
c  in DIMACS:
 11942  11943 -11944  960 -11945 0
 11942  11943 -11944  960 -11946 0
 11942  11943 -11944  960 -11947 0

c  0-1 --> -1
c    (-b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧ -p_960) -> ( b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0)
c  in CNF:
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨  b^{12, 81}_2
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_1
c     b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨  b^{12, 81}_0
c  in DIMACS:
 11942  11943  11944  960  11945 0
 11942  11943  11944  960 -11946 0
 11942  11943  11944  960  11947 0

c  -1-1 --> -2
c    ( b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧  b^{12, 80}_0 ∧ -p_960) -> ( b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0)
c  in CNF:
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨  b^{12, 81}_2
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨  b^{12, 81}_1
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨  p_960 ∨ -b^{12, 81}_0
c  in DIMACS:
-11942  11943 -11944  960  11945 0
-11942  11943 -11944  960  11946 0
-11942  11943 -11944  960 -11947 0

c  -2-1 --> break 
c    ( b^{12, 80}_2 ∧  b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨  b^{12, 80}_0 ∨  p_960 ∨ break
c  in DIMACS:
-11942 -11943  11944  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 80}_2 ∧ -b^{12, 80}_1 ∧ -b^{12, 80}_0 ∧ true) 
c  in CNF:
c    -b^{12, 80}_2 ∨  b^{12, 80}_1 ∨  b^{12, 80}_0 ∨ false 
c  in DIMACS:
-11942  11943  11944  0

c  3 does not represent an automaton state.
c    -(-b^{12, 80}_2 ∧  b^{12, 80}_1 ∧  b^{12, 80}_0 ∧ true) 
c  in CNF:
c     b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ false 
c  in DIMACS:
 11942 -11943 -11944  0
c  -3 does not represent an automaton state.
c    -( b^{12, 80}_2 ∧  b^{12, 80}_1 ∧  b^{12, 80}_0 ∧ true) 
c  in CNF:
c    -b^{12, 80}_2 ∨ -b^{12, 80}_1 ∨ -b^{12, 80}_0 ∨ false 
c  in DIMACS:
-11942 -11943 -11944  0

c i = 81
c  -2+1 --> -1
c    ( b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧  p_972) -> ( b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0)
c  in CNF:
c    -b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨  b^{12, 82}_2
c    -b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_1
c    -b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨  b^{12, 82}_0
c  in DIMACS:
-11945 -11946  11947 -972  11948 0
-11945 -11946  11947 -972 -11949 0
-11945 -11946  11947 -972  11950 0

c  -1+1 --> 0
c    ( b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0 ∧  p_972) -> (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧ -b^{12, 82}_0)
c  in CNF:
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_2
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_1
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_0
c  in DIMACS:
-11945  11946 -11947 -972 -11948 0
-11945  11946 -11947 -972 -11949 0
-11945  11946 -11947 -972 -11950 0

c  0+1 --> 1
c    (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧  p_972) -> (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0)
c  in CNF:
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_2
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_1
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨  b^{12, 82}_0
c  in DIMACS:
 11945  11946  11947 -972 -11948 0
 11945  11946  11947 -972 -11949 0
 11945  11946  11947 -972  11950 0

c  1+1 --> 2
c    (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0 ∧  p_972) -> (-b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0)
c  in CNF:
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_2
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨  b^{12, 82}_1
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ -p_972 ∨ -b^{12, 82}_0
c  in DIMACS:
 11945  11946 -11947 -972 -11948 0
 11945  11946 -11947 -972  11949 0
 11945  11946 -11947 -972 -11950 0

c  2+1 --> break 
c    (-b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧  p_972) -> break
c  in CNF:
c     b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 11945 -11946  11947 -972 1162 0


c  2-1 --> 1
c    (-b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧ -p_972) -> (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0)
c  in CNF:
c     b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_2
c     b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_1
c     b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨  b^{12, 82}_0
c  in DIMACS:
 11945 -11946  11947  972 -11948 0
 11945 -11946  11947  972 -11949 0
 11945 -11946  11947  972  11950 0

c  1-1 --> 0
c    (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0 ∧ -p_972) -> (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧ -b^{12, 82}_0)
c  in CNF:
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_2
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_1
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_0
c  in DIMACS:
 11945  11946 -11947  972 -11948 0
 11945  11946 -11947  972 -11949 0
 11945  11946 -11947  972 -11950 0

c  0-1 --> -1
c    (-b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧ -p_972) -> ( b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0)
c  in CNF:
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨  b^{12, 82}_2
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_1
c     b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨  b^{12, 82}_0
c  in DIMACS:
 11945  11946  11947  972  11948 0
 11945  11946  11947  972 -11949 0
 11945  11946  11947  972  11950 0

c  -1-1 --> -2
c    ( b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧  b^{12, 81}_0 ∧ -p_972) -> ( b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0)
c  in CNF:
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨  b^{12, 82}_2
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨  b^{12, 82}_1
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨  p_972 ∨ -b^{12, 82}_0
c  in DIMACS:
-11945  11946 -11947  972  11948 0
-11945  11946 -11947  972  11949 0
-11945  11946 -11947  972 -11950 0

c  -2-1 --> break 
c    ( b^{12, 81}_2 ∧  b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨  b^{12, 81}_0 ∨  p_972 ∨ break
c  in DIMACS:
-11945 -11946  11947  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 81}_2 ∧ -b^{12, 81}_1 ∧ -b^{12, 81}_0 ∧ true) 
c  in CNF:
c    -b^{12, 81}_2 ∨  b^{12, 81}_1 ∨  b^{12, 81}_0 ∨ false 
c  in DIMACS:
-11945  11946  11947  0

c  3 does not represent an automaton state.
c    -(-b^{12, 81}_2 ∧  b^{12, 81}_1 ∧  b^{12, 81}_0 ∧ true) 
c  in CNF:
c     b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ false 
c  in DIMACS:
 11945 -11946 -11947  0
c  -3 does not represent an automaton state.
c    -( b^{12, 81}_2 ∧  b^{12, 81}_1 ∧  b^{12, 81}_0 ∧ true) 
c  in CNF:
c    -b^{12, 81}_2 ∨ -b^{12, 81}_1 ∨ -b^{12, 81}_0 ∨ false 
c  in DIMACS:
-11945 -11946 -11947  0

c i = 82
c  -2+1 --> -1
c    ( b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧  p_984) -> ( b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0)
c  in CNF:
c    -b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨  b^{12, 83}_2
c    -b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_1
c    -b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨  b^{12, 83}_0
c  in DIMACS:
-11948 -11949  11950 -984  11951 0
-11948 -11949  11950 -984 -11952 0
-11948 -11949  11950 -984  11953 0

c  -1+1 --> 0
c    ( b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0 ∧  p_984) -> (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧ -b^{12, 83}_0)
c  in CNF:
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_2
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_1
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_0
c  in DIMACS:
-11948  11949 -11950 -984 -11951 0
-11948  11949 -11950 -984 -11952 0
-11948  11949 -11950 -984 -11953 0

c  0+1 --> 1
c    (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧  p_984) -> (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0)
c  in CNF:
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_2
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_1
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨  b^{12, 83}_0
c  in DIMACS:
 11948  11949  11950 -984 -11951 0
 11948  11949  11950 -984 -11952 0
 11948  11949  11950 -984  11953 0

c  1+1 --> 2
c    (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0 ∧  p_984) -> (-b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0)
c  in CNF:
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_2
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨  b^{12, 83}_1
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ -p_984 ∨ -b^{12, 83}_0
c  in DIMACS:
 11948  11949 -11950 -984 -11951 0
 11948  11949 -11950 -984  11952 0
 11948  11949 -11950 -984 -11953 0

c  2+1 --> break 
c    (-b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧  p_984) -> break
c  in CNF:
c     b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 11948 -11949  11950 -984 1162 0


c  2-1 --> 1
c    (-b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧ -p_984) -> (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0)
c  in CNF:
c     b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_2
c     b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_1
c     b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨  b^{12, 83}_0
c  in DIMACS:
 11948 -11949  11950  984 -11951 0
 11948 -11949  11950  984 -11952 0
 11948 -11949  11950  984  11953 0

c  1-1 --> 0
c    (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0 ∧ -p_984) -> (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧ -b^{12, 83}_0)
c  in CNF:
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_2
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_1
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_0
c  in DIMACS:
 11948  11949 -11950  984 -11951 0
 11948  11949 -11950  984 -11952 0
 11948  11949 -11950  984 -11953 0

c  0-1 --> -1
c    (-b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧ -p_984) -> ( b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0)
c  in CNF:
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨  b^{12, 83}_2
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_1
c     b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨  b^{12, 83}_0
c  in DIMACS:
 11948  11949  11950  984  11951 0
 11948  11949  11950  984 -11952 0
 11948  11949  11950  984  11953 0

c  -1-1 --> -2
c    ( b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧  b^{12, 82}_0 ∧ -p_984) -> ( b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0)
c  in CNF:
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨  b^{12, 83}_2
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨  b^{12, 83}_1
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨  p_984 ∨ -b^{12, 83}_0
c  in DIMACS:
-11948  11949 -11950  984  11951 0
-11948  11949 -11950  984  11952 0
-11948  11949 -11950  984 -11953 0

c  -2-1 --> break 
c    ( b^{12, 82}_2 ∧  b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨  b^{12, 82}_0 ∨  p_984 ∨ break
c  in DIMACS:
-11948 -11949  11950  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 82}_2 ∧ -b^{12, 82}_1 ∧ -b^{12, 82}_0 ∧ true) 
c  in CNF:
c    -b^{12, 82}_2 ∨  b^{12, 82}_1 ∨  b^{12, 82}_0 ∨ false 
c  in DIMACS:
-11948  11949  11950  0

c  3 does not represent an automaton state.
c    -(-b^{12, 82}_2 ∧  b^{12, 82}_1 ∧  b^{12, 82}_0 ∧ true) 
c  in CNF:
c     b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ false 
c  in DIMACS:
 11948 -11949 -11950  0
c  -3 does not represent an automaton state.
c    -( b^{12, 82}_2 ∧  b^{12, 82}_1 ∧  b^{12, 82}_0 ∧ true) 
c  in CNF:
c    -b^{12, 82}_2 ∨ -b^{12, 82}_1 ∨ -b^{12, 82}_0 ∨ false 
c  in DIMACS:
-11948 -11949 -11950  0

c i = 83
c  -2+1 --> -1
c    ( b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧  p_996) -> ( b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0)
c  in CNF:
c    -b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨  b^{12, 84}_2
c    -b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_1
c    -b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨  b^{12, 84}_0
c  in DIMACS:
-11951 -11952  11953 -996  11954 0
-11951 -11952  11953 -996 -11955 0
-11951 -11952  11953 -996  11956 0

c  -1+1 --> 0
c    ( b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0 ∧  p_996) -> (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧ -b^{12, 84}_0)
c  in CNF:
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_2
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_1
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_0
c  in DIMACS:
-11951  11952 -11953 -996 -11954 0
-11951  11952 -11953 -996 -11955 0
-11951  11952 -11953 -996 -11956 0

c  0+1 --> 1
c    (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧  p_996) -> (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0)
c  in CNF:
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_2
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_1
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨  b^{12, 84}_0
c  in DIMACS:
 11951  11952  11953 -996 -11954 0
 11951  11952  11953 -996 -11955 0
 11951  11952  11953 -996  11956 0

c  1+1 --> 2
c    (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0 ∧  p_996) -> (-b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0)
c  in CNF:
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_2
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨  b^{12, 84}_1
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ -p_996 ∨ -b^{12, 84}_0
c  in DIMACS:
 11951  11952 -11953 -996 -11954 0
 11951  11952 -11953 -996  11955 0
 11951  11952 -11953 -996 -11956 0

c  2+1 --> break 
c    (-b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧  p_996) -> break
c  in CNF:
c     b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 11951 -11952  11953 -996 1162 0


c  2-1 --> 1
c    (-b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧ -p_996) -> (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0)
c  in CNF:
c     b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_2
c     b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_1
c     b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨  b^{12, 84}_0
c  in DIMACS:
 11951 -11952  11953  996 -11954 0
 11951 -11952  11953  996 -11955 0
 11951 -11952  11953  996  11956 0

c  1-1 --> 0
c    (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0 ∧ -p_996) -> (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧ -b^{12, 84}_0)
c  in CNF:
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_2
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_1
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_0
c  in DIMACS:
 11951  11952 -11953  996 -11954 0
 11951  11952 -11953  996 -11955 0
 11951  11952 -11953  996 -11956 0

c  0-1 --> -1
c    (-b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧ -p_996) -> ( b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0)
c  in CNF:
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨  b^{12, 84}_2
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_1
c     b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨  b^{12, 84}_0
c  in DIMACS:
 11951  11952  11953  996  11954 0
 11951  11952  11953  996 -11955 0
 11951  11952  11953  996  11956 0

c  -1-1 --> -2
c    ( b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧  b^{12, 83}_0 ∧ -p_996) -> ( b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0)
c  in CNF:
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨  b^{12, 84}_2
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨  b^{12, 84}_1
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨  p_996 ∨ -b^{12, 84}_0
c  in DIMACS:
-11951  11952 -11953  996  11954 0
-11951  11952 -11953  996  11955 0
-11951  11952 -11953  996 -11956 0

c  -2-1 --> break 
c    ( b^{12, 83}_2 ∧  b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨  b^{12, 83}_0 ∨  p_996 ∨ break
c  in DIMACS:
-11951 -11952  11953  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 83}_2 ∧ -b^{12, 83}_1 ∧ -b^{12, 83}_0 ∧ true) 
c  in CNF:
c    -b^{12, 83}_2 ∨  b^{12, 83}_1 ∨  b^{12, 83}_0 ∨ false 
c  in DIMACS:
-11951  11952  11953  0

c  3 does not represent an automaton state.
c    -(-b^{12, 83}_2 ∧  b^{12, 83}_1 ∧  b^{12, 83}_0 ∧ true) 
c  in CNF:
c     b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ false 
c  in DIMACS:
 11951 -11952 -11953  0
c  -3 does not represent an automaton state.
c    -( b^{12, 83}_2 ∧  b^{12, 83}_1 ∧  b^{12, 83}_0 ∧ true) 
c  in CNF:
c    -b^{12, 83}_2 ∨ -b^{12, 83}_1 ∨ -b^{12, 83}_0 ∨ false 
c  in DIMACS:
-11951 -11952 -11953  0

c i = 84
c  -2+1 --> -1
c    ( b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧  p_1008) -> ( b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0)
c  in CNF:
c    -b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨  b^{12, 85}_2
c    -b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_1
c    -b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨  b^{12, 85}_0
c  in DIMACS:
-11954 -11955  11956 -1008  11957 0
-11954 -11955  11956 -1008 -11958 0
-11954 -11955  11956 -1008  11959 0

c  -1+1 --> 0
c    ( b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0 ∧  p_1008) -> (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧ -b^{12, 85}_0)
c  in CNF:
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_2
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_1
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_0
c  in DIMACS:
-11954  11955 -11956 -1008 -11957 0
-11954  11955 -11956 -1008 -11958 0
-11954  11955 -11956 -1008 -11959 0

c  0+1 --> 1
c    (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧  p_1008) -> (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0)
c  in CNF:
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_2
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_1
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨  b^{12, 85}_0
c  in DIMACS:
 11954  11955  11956 -1008 -11957 0
 11954  11955  11956 -1008 -11958 0
 11954  11955  11956 -1008  11959 0

c  1+1 --> 2
c    (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0 ∧  p_1008) -> (-b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0)
c  in CNF:
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_2
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨  b^{12, 85}_1
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ -p_1008 ∨ -b^{12, 85}_0
c  in DIMACS:
 11954  11955 -11956 -1008 -11957 0
 11954  11955 -11956 -1008  11958 0
 11954  11955 -11956 -1008 -11959 0

c  2+1 --> break 
c    (-b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 11954 -11955  11956 -1008 1162 0


c  2-1 --> 1
c    (-b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧ -p_1008) -> (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0)
c  in CNF:
c     b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_2
c     b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_1
c     b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨  b^{12, 85}_0
c  in DIMACS:
 11954 -11955  11956  1008 -11957 0
 11954 -11955  11956  1008 -11958 0
 11954 -11955  11956  1008  11959 0

c  1-1 --> 0
c    (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0 ∧ -p_1008) -> (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧ -b^{12, 85}_0)
c  in CNF:
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_2
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_1
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_0
c  in DIMACS:
 11954  11955 -11956  1008 -11957 0
 11954  11955 -11956  1008 -11958 0
 11954  11955 -11956  1008 -11959 0

c  0-1 --> -1
c    (-b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧ -p_1008) -> ( b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0)
c  in CNF:
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨  b^{12, 85}_2
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_1
c     b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨  b^{12, 85}_0
c  in DIMACS:
 11954  11955  11956  1008  11957 0
 11954  11955  11956  1008 -11958 0
 11954  11955  11956  1008  11959 0

c  -1-1 --> -2
c    ( b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧  b^{12, 84}_0 ∧ -p_1008) -> ( b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0)
c  in CNF:
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨  b^{12, 85}_2
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨  b^{12, 85}_1
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨  p_1008 ∨ -b^{12, 85}_0
c  in DIMACS:
-11954  11955 -11956  1008  11957 0
-11954  11955 -11956  1008  11958 0
-11954  11955 -11956  1008 -11959 0

c  -2-1 --> break 
c    ( b^{12, 84}_2 ∧  b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨  b^{12, 84}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-11954 -11955  11956  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 84}_2 ∧ -b^{12, 84}_1 ∧ -b^{12, 84}_0 ∧ true) 
c  in CNF:
c    -b^{12, 84}_2 ∨  b^{12, 84}_1 ∨  b^{12, 84}_0 ∨ false 
c  in DIMACS:
-11954  11955  11956  0

c  3 does not represent an automaton state.
c    -(-b^{12, 84}_2 ∧  b^{12, 84}_1 ∧  b^{12, 84}_0 ∧ true) 
c  in CNF:
c     b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ false 
c  in DIMACS:
 11954 -11955 -11956  0
c  -3 does not represent an automaton state.
c    -( b^{12, 84}_2 ∧  b^{12, 84}_1 ∧  b^{12, 84}_0 ∧ true) 
c  in CNF:
c    -b^{12, 84}_2 ∨ -b^{12, 84}_1 ∨ -b^{12, 84}_0 ∨ false 
c  in DIMACS:
-11954 -11955 -11956  0

c i = 85
c  -2+1 --> -1
c    ( b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧  p_1020) -> ( b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0)
c  in CNF:
c    -b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨  b^{12, 86}_2
c    -b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_1
c    -b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨  b^{12, 86}_0
c  in DIMACS:
-11957 -11958  11959 -1020  11960 0
-11957 -11958  11959 -1020 -11961 0
-11957 -11958  11959 -1020  11962 0

c  -1+1 --> 0
c    ( b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0 ∧  p_1020) -> (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧ -b^{12, 86}_0)
c  in CNF:
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_2
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_1
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_0
c  in DIMACS:
-11957  11958 -11959 -1020 -11960 0
-11957  11958 -11959 -1020 -11961 0
-11957  11958 -11959 -1020 -11962 0

c  0+1 --> 1
c    (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧  p_1020) -> (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0)
c  in CNF:
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_2
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_1
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨  b^{12, 86}_0
c  in DIMACS:
 11957  11958  11959 -1020 -11960 0
 11957  11958  11959 -1020 -11961 0
 11957  11958  11959 -1020  11962 0

c  1+1 --> 2
c    (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0 ∧  p_1020) -> (-b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0)
c  in CNF:
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_2
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨  b^{12, 86}_1
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ -p_1020 ∨ -b^{12, 86}_0
c  in DIMACS:
 11957  11958 -11959 -1020 -11960 0
 11957  11958 -11959 -1020  11961 0
 11957  11958 -11959 -1020 -11962 0

c  2+1 --> break 
c    (-b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 11957 -11958  11959 -1020 1162 0


c  2-1 --> 1
c    (-b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧ -p_1020) -> (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0)
c  in CNF:
c     b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_2
c     b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_1
c     b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨  b^{12, 86}_0
c  in DIMACS:
 11957 -11958  11959  1020 -11960 0
 11957 -11958  11959  1020 -11961 0
 11957 -11958  11959  1020  11962 0

c  1-1 --> 0
c    (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0 ∧ -p_1020) -> (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧ -b^{12, 86}_0)
c  in CNF:
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_2
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_1
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_0
c  in DIMACS:
 11957  11958 -11959  1020 -11960 0
 11957  11958 -11959  1020 -11961 0
 11957  11958 -11959  1020 -11962 0

c  0-1 --> -1
c    (-b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧ -p_1020) -> ( b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0)
c  in CNF:
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨  b^{12, 86}_2
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_1
c     b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨  b^{12, 86}_0
c  in DIMACS:
 11957  11958  11959  1020  11960 0
 11957  11958  11959  1020 -11961 0
 11957  11958  11959  1020  11962 0

c  -1-1 --> -2
c    ( b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧  b^{12, 85}_0 ∧ -p_1020) -> ( b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0)
c  in CNF:
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨  b^{12, 86}_2
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨  b^{12, 86}_1
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨  p_1020 ∨ -b^{12, 86}_0
c  in DIMACS:
-11957  11958 -11959  1020  11960 0
-11957  11958 -11959  1020  11961 0
-11957  11958 -11959  1020 -11962 0

c  -2-1 --> break 
c    ( b^{12, 85}_2 ∧  b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨  b^{12, 85}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-11957 -11958  11959  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 85}_2 ∧ -b^{12, 85}_1 ∧ -b^{12, 85}_0 ∧ true) 
c  in CNF:
c    -b^{12, 85}_2 ∨  b^{12, 85}_1 ∨  b^{12, 85}_0 ∨ false 
c  in DIMACS:
-11957  11958  11959  0

c  3 does not represent an automaton state.
c    -(-b^{12, 85}_2 ∧  b^{12, 85}_1 ∧  b^{12, 85}_0 ∧ true) 
c  in CNF:
c     b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ false 
c  in DIMACS:
 11957 -11958 -11959  0
c  -3 does not represent an automaton state.
c    -( b^{12, 85}_2 ∧  b^{12, 85}_1 ∧  b^{12, 85}_0 ∧ true) 
c  in CNF:
c    -b^{12, 85}_2 ∨ -b^{12, 85}_1 ∨ -b^{12, 85}_0 ∨ false 
c  in DIMACS:
-11957 -11958 -11959  0

c i = 86
c  -2+1 --> -1
c    ( b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧  p_1032) -> ( b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0)
c  in CNF:
c    -b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨  b^{12, 87}_2
c    -b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_1
c    -b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨  b^{12, 87}_0
c  in DIMACS:
-11960 -11961  11962 -1032  11963 0
-11960 -11961  11962 -1032 -11964 0
-11960 -11961  11962 -1032  11965 0

c  -1+1 --> 0
c    ( b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0 ∧  p_1032) -> (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧ -b^{12, 87}_0)
c  in CNF:
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_2
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_1
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_0
c  in DIMACS:
-11960  11961 -11962 -1032 -11963 0
-11960  11961 -11962 -1032 -11964 0
-11960  11961 -11962 -1032 -11965 0

c  0+1 --> 1
c    (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧  p_1032) -> (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0)
c  in CNF:
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_2
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_1
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨  b^{12, 87}_0
c  in DIMACS:
 11960  11961  11962 -1032 -11963 0
 11960  11961  11962 -1032 -11964 0
 11960  11961  11962 -1032  11965 0

c  1+1 --> 2
c    (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0 ∧  p_1032) -> (-b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0)
c  in CNF:
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_2
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨  b^{12, 87}_1
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ -p_1032 ∨ -b^{12, 87}_0
c  in DIMACS:
 11960  11961 -11962 -1032 -11963 0
 11960  11961 -11962 -1032  11964 0
 11960  11961 -11962 -1032 -11965 0

c  2+1 --> break 
c    (-b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 11960 -11961  11962 -1032 1162 0


c  2-1 --> 1
c    (-b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧ -p_1032) -> (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0)
c  in CNF:
c     b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_2
c     b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_1
c     b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨  b^{12, 87}_0
c  in DIMACS:
 11960 -11961  11962  1032 -11963 0
 11960 -11961  11962  1032 -11964 0
 11960 -11961  11962  1032  11965 0

c  1-1 --> 0
c    (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0 ∧ -p_1032) -> (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧ -b^{12, 87}_0)
c  in CNF:
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_2
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_1
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_0
c  in DIMACS:
 11960  11961 -11962  1032 -11963 0
 11960  11961 -11962  1032 -11964 0
 11960  11961 -11962  1032 -11965 0

c  0-1 --> -1
c    (-b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧ -p_1032) -> ( b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0)
c  in CNF:
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨  b^{12, 87}_2
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_1
c     b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨  b^{12, 87}_0
c  in DIMACS:
 11960  11961  11962  1032  11963 0
 11960  11961  11962  1032 -11964 0
 11960  11961  11962  1032  11965 0

c  -1-1 --> -2
c    ( b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧  b^{12, 86}_0 ∧ -p_1032) -> ( b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0)
c  in CNF:
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨  b^{12, 87}_2
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨  b^{12, 87}_1
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨  p_1032 ∨ -b^{12, 87}_0
c  in DIMACS:
-11960  11961 -11962  1032  11963 0
-11960  11961 -11962  1032  11964 0
-11960  11961 -11962  1032 -11965 0

c  -2-1 --> break 
c    ( b^{12, 86}_2 ∧  b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨  b^{12, 86}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-11960 -11961  11962  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 86}_2 ∧ -b^{12, 86}_1 ∧ -b^{12, 86}_0 ∧ true) 
c  in CNF:
c    -b^{12, 86}_2 ∨  b^{12, 86}_1 ∨  b^{12, 86}_0 ∨ false 
c  in DIMACS:
-11960  11961  11962  0

c  3 does not represent an automaton state.
c    -(-b^{12, 86}_2 ∧  b^{12, 86}_1 ∧  b^{12, 86}_0 ∧ true) 
c  in CNF:
c     b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ false 
c  in DIMACS:
 11960 -11961 -11962  0
c  -3 does not represent an automaton state.
c    -( b^{12, 86}_2 ∧  b^{12, 86}_1 ∧  b^{12, 86}_0 ∧ true) 
c  in CNF:
c    -b^{12, 86}_2 ∨ -b^{12, 86}_1 ∨ -b^{12, 86}_0 ∨ false 
c  in DIMACS:
-11960 -11961 -11962  0

c i = 87
c  -2+1 --> -1
c    ( b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧  p_1044) -> ( b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0)
c  in CNF:
c    -b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨  b^{12, 88}_2
c    -b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_1
c    -b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨  b^{12, 88}_0
c  in DIMACS:
-11963 -11964  11965 -1044  11966 0
-11963 -11964  11965 -1044 -11967 0
-11963 -11964  11965 -1044  11968 0

c  -1+1 --> 0
c    ( b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0 ∧  p_1044) -> (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧ -b^{12, 88}_0)
c  in CNF:
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_2
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_1
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_0
c  in DIMACS:
-11963  11964 -11965 -1044 -11966 0
-11963  11964 -11965 -1044 -11967 0
-11963  11964 -11965 -1044 -11968 0

c  0+1 --> 1
c    (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧  p_1044) -> (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0)
c  in CNF:
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_2
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_1
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨  b^{12, 88}_0
c  in DIMACS:
 11963  11964  11965 -1044 -11966 0
 11963  11964  11965 -1044 -11967 0
 11963  11964  11965 -1044  11968 0

c  1+1 --> 2
c    (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0 ∧  p_1044) -> (-b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0)
c  in CNF:
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_2
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨  b^{12, 88}_1
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ -p_1044 ∨ -b^{12, 88}_0
c  in DIMACS:
 11963  11964 -11965 -1044 -11966 0
 11963  11964 -11965 -1044  11967 0
 11963  11964 -11965 -1044 -11968 0

c  2+1 --> break 
c    (-b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 11963 -11964  11965 -1044 1162 0


c  2-1 --> 1
c    (-b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧ -p_1044) -> (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0)
c  in CNF:
c     b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_2
c     b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_1
c     b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨  b^{12, 88}_0
c  in DIMACS:
 11963 -11964  11965  1044 -11966 0
 11963 -11964  11965  1044 -11967 0
 11963 -11964  11965  1044  11968 0

c  1-1 --> 0
c    (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0 ∧ -p_1044) -> (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧ -b^{12, 88}_0)
c  in CNF:
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_2
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_1
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_0
c  in DIMACS:
 11963  11964 -11965  1044 -11966 0
 11963  11964 -11965  1044 -11967 0
 11963  11964 -11965  1044 -11968 0

c  0-1 --> -1
c    (-b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧ -p_1044) -> ( b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0)
c  in CNF:
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨  b^{12, 88}_2
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_1
c     b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨  b^{12, 88}_0
c  in DIMACS:
 11963  11964  11965  1044  11966 0
 11963  11964  11965  1044 -11967 0
 11963  11964  11965  1044  11968 0

c  -1-1 --> -2
c    ( b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧  b^{12, 87}_0 ∧ -p_1044) -> ( b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0)
c  in CNF:
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨  b^{12, 88}_2
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨  b^{12, 88}_1
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨  p_1044 ∨ -b^{12, 88}_0
c  in DIMACS:
-11963  11964 -11965  1044  11966 0
-11963  11964 -11965  1044  11967 0
-11963  11964 -11965  1044 -11968 0

c  -2-1 --> break 
c    ( b^{12, 87}_2 ∧  b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨  b^{12, 87}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-11963 -11964  11965  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 87}_2 ∧ -b^{12, 87}_1 ∧ -b^{12, 87}_0 ∧ true) 
c  in CNF:
c    -b^{12, 87}_2 ∨  b^{12, 87}_1 ∨  b^{12, 87}_0 ∨ false 
c  in DIMACS:
-11963  11964  11965  0

c  3 does not represent an automaton state.
c    -(-b^{12, 87}_2 ∧  b^{12, 87}_1 ∧  b^{12, 87}_0 ∧ true) 
c  in CNF:
c     b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ false 
c  in DIMACS:
 11963 -11964 -11965  0
c  -3 does not represent an automaton state.
c    -( b^{12, 87}_2 ∧  b^{12, 87}_1 ∧  b^{12, 87}_0 ∧ true) 
c  in CNF:
c    -b^{12, 87}_2 ∨ -b^{12, 87}_1 ∨ -b^{12, 87}_0 ∨ false 
c  in DIMACS:
-11963 -11964 -11965  0

c i = 88
c  -2+1 --> -1
c    ( b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧  p_1056) -> ( b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0)
c  in CNF:
c    -b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨  b^{12, 89}_2
c    -b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_1
c    -b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨  b^{12, 89}_0
c  in DIMACS:
-11966 -11967  11968 -1056  11969 0
-11966 -11967  11968 -1056 -11970 0
-11966 -11967  11968 -1056  11971 0

c  -1+1 --> 0
c    ( b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0 ∧  p_1056) -> (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧ -b^{12, 89}_0)
c  in CNF:
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_2
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_1
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_0
c  in DIMACS:
-11966  11967 -11968 -1056 -11969 0
-11966  11967 -11968 -1056 -11970 0
-11966  11967 -11968 -1056 -11971 0

c  0+1 --> 1
c    (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧  p_1056) -> (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0)
c  in CNF:
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_2
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_1
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨  b^{12, 89}_0
c  in DIMACS:
 11966  11967  11968 -1056 -11969 0
 11966  11967  11968 -1056 -11970 0
 11966  11967  11968 -1056  11971 0

c  1+1 --> 2
c    (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0 ∧  p_1056) -> (-b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0)
c  in CNF:
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_2
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨  b^{12, 89}_1
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ -p_1056 ∨ -b^{12, 89}_0
c  in DIMACS:
 11966  11967 -11968 -1056 -11969 0
 11966  11967 -11968 -1056  11970 0
 11966  11967 -11968 -1056 -11971 0

c  2+1 --> break 
c    (-b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 11966 -11967  11968 -1056 1162 0


c  2-1 --> 1
c    (-b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧ -p_1056) -> (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0)
c  in CNF:
c     b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_2
c     b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_1
c     b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨  b^{12, 89}_0
c  in DIMACS:
 11966 -11967  11968  1056 -11969 0
 11966 -11967  11968  1056 -11970 0
 11966 -11967  11968  1056  11971 0

c  1-1 --> 0
c    (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0 ∧ -p_1056) -> (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧ -b^{12, 89}_0)
c  in CNF:
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_2
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_1
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_0
c  in DIMACS:
 11966  11967 -11968  1056 -11969 0
 11966  11967 -11968  1056 -11970 0
 11966  11967 -11968  1056 -11971 0

c  0-1 --> -1
c    (-b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧ -p_1056) -> ( b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0)
c  in CNF:
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨  b^{12, 89}_2
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_1
c     b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨  b^{12, 89}_0
c  in DIMACS:
 11966  11967  11968  1056  11969 0
 11966  11967  11968  1056 -11970 0
 11966  11967  11968  1056  11971 0

c  -1-1 --> -2
c    ( b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧  b^{12, 88}_0 ∧ -p_1056) -> ( b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0)
c  in CNF:
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨  b^{12, 89}_2
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨  b^{12, 89}_1
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨  p_1056 ∨ -b^{12, 89}_0
c  in DIMACS:
-11966  11967 -11968  1056  11969 0
-11966  11967 -11968  1056  11970 0
-11966  11967 -11968  1056 -11971 0

c  -2-1 --> break 
c    ( b^{12, 88}_2 ∧  b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨  b^{12, 88}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-11966 -11967  11968  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 88}_2 ∧ -b^{12, 88}_1 ∧ -b^{12, 88}_0 ∧ true) 
c  in CNF:
c    -b^{12, 88}_2 ∨  b^{12, 88}_1 ∨  b^{12, 88}_0 ∨ false 
c  in DIMACS:
-11966  11967  11968  0

c  3 does not represent an automaton state.
c    -(-b^{12, 88}_2 ∧  b^{12, 88}_1 ∧  b^{12, 88}_0 ∧ true) 
c  in CNF:
c     b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ false 
c  in DIMACS:
 11966 -11967 -11968  0
c  -3 does not represent an automaton state.
c    -( b^{12, 88}_2 ∧  b^{12, 88}_1 ∧  b^{12, 88}_0 ∧ true) 
c  in CNF:
c    -b^{12, 88}_2 ∨ -b^{12, 88}_1 ∨ -b^{12, 88}_0 ∨ false 
c  in DIMACS:
-11966 -11967 -11968  0

c i = 89
c  -2+1 --> -1
c    ( b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧  p_1068) -> ( b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0)
c  in CNF:
c    -b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨  b^{12, 90}_2
c    -b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_1
c    -b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨  b^{12, 90}_0
c  in DIMACS:
-11969 -11970  11971 -1068  11972 0
-11969 -11970  11971 -1068 -11973 0
-11969 -11970  11971 -1068  11974 0

c  -1+1 --> 0
c    ( b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0 ∧  p_1068) -> (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧ -b^{12, 90}_0)
c  in CNF:
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_2
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_1
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_0
c  in DIMACS:
-11969  11970 -11971 -1068 -11972 0
-11969  11970 -11971 -1068 -11973 0
-11969  11970 -11971 -1068 -11974 0

c  0+1 --> 1
c    (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧  p_1068) -> (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0)
c  in CNF:
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_2
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_1
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨  b^{12, 90}_0
c  in DIMACS:
 11969  11970  11971 -1068 -11972 0
 11969  11970  11971 -1068 -11973 0
 11969  11970  11971 -1068  11974 0

c  1+1 --> 2
c    (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0 ∧  p_1068) -> (-b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0)
c  in CNF:
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_2
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨  b^{12, 90}_1
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ -p_1068 ∨ -b^{12, 90}_0
c  in DIMACS:
 11969  11970 -11971 -1068 -11972 0
 11969  11970 -11971 -1068  11973 0
 11969  11970 -11971 -1068 -11974 0

c  2+1 --> break 
c    (-b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 11969 -11970  11971 -1068 1162 0


c  2-1 --> 1
c    (-b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧ -p_1068) -> (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0)
c  in CNF:
c     b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_2
c     b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_1
c     b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨  b^{12, 90}_0
c  in DIMACS:
 11969 -11970  11971  1068 -11972 0
 11969 -11970  11971  1068 -11973 0
 11969 -11970  11971  1068  11974 0

c  1-1 --> 0
c    (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0 ∧ -p_1068) -> (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧ -b^{12, 90}_0)
c  in CNF:
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_2
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_1
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_0
c  in DIMACS:
 11969  11970 -11971  1068 -11972 0
 11969  11970 -11971  1068 -11973 0
 11969  11970 -11971  1068 -11974 0

c  0-1 --> -1
c    (-b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧ -p_1068) -> ( b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0)
c  in CNF:
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨  b^{12, 90}_2
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_1
c     b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨  b^{12, 90}_0
c  in DIMACS:
 11969  11970  11971  1068  11972 0
 11969  11970  11971  1068 -11973 0
 11969  11970  11971  1068  11974 0

c  -1-1 --> -2
c    ( b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧  b^{12, 89}_0 ∧ -p_1068) -> ( b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0)
c  in CNF:
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨  b^{12, 90}_2
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨  b^{12, 90}_1
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨  p_1068 ∨ -b^{12, 90}_0
c  in DIMACS:
-11969  11970 -11971  1068  11972 0
-11969  11970 -11971  1068  11973 0
-11969  11970 -11971  1068 -11974 0

c  -2-1 --> break 
c    ( b^{12, 89}_2 ∧  b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨  b^{12, 89}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-11969 -11970  11971  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 89}_2 ∧ -b^{12, 89}_1 ∧ -b^{12, 89}_0 ∧ true) 
c  in CNF:
c    -b^{12, 89}_2 ∨  b^{12, 89}_1 ∨  b^{12, 89}_0 ∨ false 
c  in DIMACS:
-11969  11970  11971  0

c  3 does not represent an automaton state.
c    -(-b^{12, 89}_2 ∧  b^{12, 89}_1 ∧  b^{12, 89}_0 ∧ true) 
c  in CNF:
c     b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ false 
c  in DIMACS:
 11969 -11970 -11971  0
c  -3 does not represent an automaton state.
c    -( b^{12, 89}_2 ∧  b^{12, 89}_1 ∧  b^{12, 89}_0 ∧ true) 
c  in CNF:
c    -b^{12, 89}_2 ∨ -b^{12, 89}_1 ∨ -b^{12, 89}_0 ∨ false 
c  in DIMACS:
-11969 -11970 -11971  0

c i = 90
c  -2+1 --> -1
c    ( b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧  p_1080) -> ( b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0)
c  in CNF:
c    -b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨  b^{12, 91}_2
c    -b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_1
c    -b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨  b^{12, 91}_0
c  in DIMACS:
-11972 -11973  11974 -1080  11975 0
-11972 -11973  11974 -1080 -11976 0
-11972 -11973  11974 -1080  11977 0

c  -1+1 --> 0
c    ( b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0 ∧  p_1080) -> (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧ -b^{12, 91}_0)
c  in CNF:
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_2
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_1
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_0
c  in DIMACS:
-11972  11973 -11974 -1080 -11975 0
-11972  11973 -11974 -1080 -11976 0
-11972  11973 -11974 -1080 -11977 0

c  0+1 --> 1
c    (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧  p_1080) -> (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0)
c  in CNF:
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_2
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_1
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨  b^{12, 91}_0
c  in DIMACS:
 11972  11973  11974 -1080 -11975 0
 11972  11973  11974 -1080 -11976 0
 11972  11973  11974 -1080  11977 0

c  1+1 --> 2
c    (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0 ∧  p_1080) -> (-b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0)
c  in CNF:
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_2
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨  b^{12, 91}_1
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ -p_1080 ∨ -b^{12, 91}_0
c  in DIMACS:
 11972  11973 -11974 -1080 -11975 0
 11972  11973 -11974 -1080  11976 0
 11972  11973 -11974 -1080 -11977 0

c  2+1 --> break 
c    (-b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 11972 -11973  11974 -1080 1162 0


c  2-1 --> 1
c    (-b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧ -p_1080) -> (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0)
c  in CNF:
c     b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_2
c     b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_1
c     b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨  b^{12, 91}_0
c  in DIMACS:
 11972 -11973  11974  1080 -11975 0
 11972 -11973  11974  1080 -11976 0
 11972 -11973  11974  1080  11977 0

c  1-1 --> 0
c    (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0 ∧ -p_1080) -> (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧ -b^{12, 91}_0)
c  in CNF:
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_2
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_1
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_0
c  in DIMACS:
 11972  11973 -11974  1080 -11975 0
 11972  11973 -11974  1080 -11976 0
 11972  11973 -11974  1080 -11977 0

c  0-1 --> -1
c    (-b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧ -p_1080) -> ( b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0)
c  in CNF:
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨  b^{12, 91}_2
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_1
c     b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨  b^{12, 91}_0
c  in DIMACS:
 11972  11973  11974  1080  11975 0
 11972  11973  11974  1080 -11976 0
 11972  11973  11974  1080  11977 0

c  -1-1 --> -2
c    ( b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧  b^{12, 90}_0 ∧ -p_1080) -> ( b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0)
c  in CNF:
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨  b^{12, 91}_2
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨  b^{12, 91}_1
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨  p_1080 ∨ -b^{12, 91}_0
c  in DIMACS:
-11972  11973 -11974  1080  11975 0
-11972  11973 -11974  1080  11976 0
-11972  11973 -11974  1080 -11977 0

c  -2-1 --> break 
c    ( b^{12, 90}_2 ∧  b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨  b^{12, 90}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-11972 -11973  11974  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 90}_2 ∧ -b^{12, 90}_1 ∧ -b^{12, 90}_0 ∧ true) 
c  in CNF:
c    -b^{12, 90}_2 ∨  b^{12, 90}_1 ∨  b^{12, 90}_0 ∨ false 
c  in DIMACS:
-11972  11973  11974  0

c  3 does not represent an automaton state.
c    -(-b^{12, 90}_2 ∧  b^{12, 90}_1 ∧  b^{12, 90}_0 ∧ true) 
c  in CNF:
c     b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ false 
c  in DIMACS:
 11972 -11973 -11974  0
c  -3 does not represent an automaton state.
c    -( b^{12, 90}_2 ∧  b^{12, 90}_1 ∧  b^{12, 90}_0 ∧ true) 
c  in CNF:
c    -b^{12, 90}_2 ∨ -b^{12, 90}_1 ∨ -b^{12, 90}_0 ∨ false 
c  in DIMACS:
-11972 -11973 -11974  0

c i = 91
c  -2+1 --> -1
c    ( b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧  p_1092) -> ( b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0)
c  in CNF:
c    -b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨  b^{12, 92}_2
c    -b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_1
c    -b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨  b^{12, 92}_0
c  in DIMACS:
-11975 -11976  11977 -1092  11978 0
-11975 -11976  11977 -1092 -11979 0
-11975 -11976  11977 -1092  11980 0

c  -1+1 --> 0
c    ( b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0 ∧  p_1092) -> (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧ -b^{12, 92}_0)
c  in CNF:
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_2
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_1
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_0
c  in DIMACS:
-11975  11976 -11977 -1092 -11978 0
-11975  11976 -11977 -1092 -11979 0
-11975  11976 -11977 -1092 -11980 0

c  0+1 --> 1
c    (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧  p_1092) -> (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0)
c  in CNF:
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_2
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_1
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨  b^{12, 92}_0
c  in DIMACS:
 11975  11976  11977 -1092 -11978 0
 11975  11976  11977 -1092 -11979 0
 11975  11976  11977 -1092  11980 0

c  1+1 --> 2
c    (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0 ∧  p_1092) -> (-b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0)
c  in CNF:
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_2
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨  b^{12, 92}_1
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ -p_1092 ∨ -b^{12, 92}_0
c  in DIMACS:
 11975  11976 -11977 -1092 -11978 0
 11975  11976 -11977 -1092  11979 0
 11975  11976 -11977 -1092 -11980 0

c  2+1 --> break 
c    (-b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 11975 -11976  11977 -1092 1162 0


c  2-1 --> 1
c    (-b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧ -p_1092) -> (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0)
c  in CNF:
c     b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_2
c     b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_1
c     b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨  b^{12, 92}_0
c  in DIMACS:
 11975 -11976  11977  1092 -11978 0
 11975 -11976  11977  1092 -11979 0
 11975 -11976  11977  1092  11980 0

c  1-1 --> 0
c    (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0 ∧ -p_1092) -> (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧ -b^{12, 92}_0)
c  in CNF:
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_2
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_1
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_0
c  in DIMACS:
 11975  11976 -11977  1092 -11978 0
 11975  11976 -11977  1092 -11979 0
 11975  11976 -11977  1092 -11980 0

c  0-1 --> -1
c    (-b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧ -p_1092) -> ( b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0)
c  in CNF:
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨  b^{12, 92}_2
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_1
c     b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨  b^{12, 92}_0
c  in DIMACS:
 11975  11976  11977  1092  11978 0
 11975  11976  11977  1092 -11979 0
 11975  11976  11977  1092  11980 0

c  -1-1 --> -2
c    ( b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧  b^{12, 91}_0 ∧ -p_1092) -> ( b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0)
c  in CNF:
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨  b^{12, 92}_2
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨  b^{12, 92}_1
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨  p_1092 ∨ -b^{12, 92}_0
c  in DIMACS:
-11975  11976 -11977  1092  11978 0
-11975  11976 -11977  1092  11979 0
-11975  11976 -11977  1092 -11980 0

c  -2-1 --> break 
c    ( b^{12, 91}_2 ∧  b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨  b^{12, 91}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-11975 -11976  11977  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 91}_2 ∧ -b^{12, 91}_1 ∧ -b^{12, 91}_0 ∧ true) 
c  in CNF:
c    -b^{12, 91}_2 ∨  b^{12, 91}_1 ∨  b^{12, 91}_0 ∨ false 
c  in DIMACS:
-11975  11976  11977  0

c  3 does not represent an automaton state.
c    -(-b^{12, 91}_2 ∧  b^{12, 91}_1 ∧  b^{12, 91}_0 ∧ true) 
c  in CNF:
c     b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ false 
c  in DIMACS:
 11975 -11976 -11977  0
c  -3 does not represent an automaton state.
c    -( b^{12, 91}_2 ∧  b^{12, 91}_1 ∧  b^{12, 91}_0 ∧ true) 
c  in CNF:
c    -b^{12, 91}_2 ∨ -b^{12, 91}_1 ∨ -b^{12, 91}_0 ∨ false 
c  in DIMACS:
-11975 -11976 -11977  0

c i = 92
c  -2+1 --> -1
c    ( b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧  p_1104) -> ( b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0)
c  in CNF:
c    -b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨  b^{12, 93}_2
c    -b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_1
c    -b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨  b^{12, 93}_0
c  in DIMACS:
-11978 -11979  11980 -1104  11981 0
-11978 -11979  11980 -1104 -11982 0
-11978 -11979  11980 -1104  11983 0

c  -1+1 --> 0
c    ( b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0 ∧  p_1104) -> (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧ -b^{12, 93}_0)
c  in CNF:
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_2
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_1
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_0
c  in DIMACS:
-11978  11979 -11980 -1104 -11981 0
-11978  11979 -11980 -1104 -11982 0
-11978  11979 -11980 -1104 -11983 0

c  0+1 --> 1
c    (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧  p_1104) -> (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0)
c  in CNF:
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_2
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_1
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨  b^{12, 93}_0
c  in DIMACS:
 11978  11979  11980 -1104 -11981 0
 11978  11979  11980 -1104 -11982 0
 11978  11979  11980 -1104  11983 0

c  1+1 --> 2
c    (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0 ∧  p_1104) -> (-b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0)
c  in CNF:
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_2
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨  b^{12, 93}_1
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ -p_1104 ∨ -b^{12, 93}_0
c  in DIMACS:
 11978  11979 -11980 -1104 -11981 0
 11978  11979 -11980 -1104  11982 0
 11978  11979 -11980 -1104 -11983 0

c  2+1 --> break 
c    (-b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 11978 -11979  11980 -1104 1162 0


c  2-1 --> 1
c    (-b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧ -p_1104) -> (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0)
c  in CNF:
c     b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_2
c     b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_1
c     b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨  b^{12, 93}_0
c  in DIMACS:
 11978 -11979  11980  1104 -11981 0
 11978 -11979  11980  1104 -11982 0
 11978 -11979  11980  1104  11983 0

c  1-1 --> 0
c    (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0 ∧ -p_1104) -> (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧ -b^{12, 93}_0)
c  in CNF:
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_2
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_1
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_0
c  in DIMACS:
 11978  11979 -11980  1104 -11981 0
 11978  11979 -11980  1104 -11982 0
 11978  11979 -11980  1104 -11983 0

c  0-1 --> -1
c    (-b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧ -p_1104) -> ( b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0)
c  in CNF:
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨  b^{12, 93}_2
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_1
c     b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨  b^{12, 93}_0
c  in DIMACS:
 11978  11979  11980  1104  11981 0
 11978  11979  11980  1104 -11982 0
 11978  11979  11980  1104  11983 0

c  -1-1 --> -2
c    ( b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧  b^{12, 92}_0 ∧ -p_1104) -> ( b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0)
c  in CNF:
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨  b^{12, 93}_2
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨  b^{12, 93}_1
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨  p_1104 ∨ -b^{12, 93}_0
c  in DIMACS:
-11978  11979 -11980  1104  11981 0
-11978  11979 -11980  1104  11982 0
-11978  11979 -11980  1104 -11983 0

c  -2-1 --> break 
c    ( b^{12, 92}_2 ∧  b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨  b^{12, 92}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-11978 -11979  11980  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 92}_2 ∧ -b^{12, 92}_1 ∧ -b^{12, 92}_0 ∧ true) 
c  in CNF:
c    -b^{12, 92}_2 ∨  b^{12, 92}_1 ∨  b^{12, 92}_0 ∨ false 
c  in DIMACS:
-11978  11979  11980  0

c  3 does not represent an automaton state.
c    -(-b^{12, 92}_2 ∧  b^{12, 92}_1 ∧  b^{12, 92}_0 ∧ true) 
c  in CNF:
c     b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ false 
c  in DIMACS:
 11978 -11979 -11980  0
c  -3 does not represent an automaton state.
c    -( b^{12, 92}_2 ∧  b^{12, 92}_1 ∧  b^{12, 92}_0 ∧ true) 
c  in CNF:
c    -b^{12, 92}_2 ∨ -b^{12, 92}_1 ∨ -b^{12, 92}_0 ∨ false 
c  in DIMACS:
-11978 -11979 -11980  0

c i = 93
c  -2+1 --> -1
c    ( b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧  p_1116) -> ( b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0)
c  in CNF:
c    -b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨  b^{12, 94}_2
c    -b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_1
c    -b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨  b^{12, 94}_0
c  in DIMACS:
-11981 -11982  11983 -1116  11984 0
-11981 -11982  11983 -1116 -11985 0
-11981 -11982  11983 -1116  11986 0

c  -1+1 --> 0
c    ( b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0 ∧  p_1116) -> (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧ -b^{12, 94}_0)
c  in CNF:
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_2
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_1
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_0
c  in DIMACS:
-11981  11982 -11983 -1116 -11984 0
-11981  11982 -11983 -1116 -11985 0
-11981  11982 -11983 -1116 -11986 0

c  0+1 --> 1
c    (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧  p_1116) -> (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0)
c  in CNF:
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_2
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_1
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨  b^{12, 94}_0
c  in DIMACS:
 11981  11982  11983 -1116 -11984 0
 11981  11982  11983 -1116 -11985 0
 11981  11982  11983 -1116  11986 0

c  1+1 --> 2
c    (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0 ∧  p_1116) -> (-b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0)
c  in CNF:
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_2
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨  b^{12, 94}_1
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ -p_1116 ∨ -b^{12, 94}_0
c  in DIMACS:
 11981  11982 -11983 -1116 -11984 0
 11981  11982 -11983 -1116  11985 0
 11981  11982 -11983 -1116 -11986 0

c  2+1 --> break 
c    (-b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 11981 -11982  11983 -1116 1162 0


c  2-1 --> 1
c    (-b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧ -p_1116) -> (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0)
c  in CNF:
c     b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_2
c     b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_1
c     b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨  b^{12, 94}_0
c  in DIMACS:
 11981 -11982  11983  1116 -11984 0
 11981 -11982  11983  1116 -11985 0
 11981 -11982  11983  1116  11986 0

c  1-1 --> 0
c    (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0 ∧ -p_1116) -> (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧ -b^{12, 94}_0)
c  in CNF:
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_2
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_1
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_0
c  in DIMACS:
 11981  11982 -11983  1116 -11984 0
 11981  11982 -11983  1116 -11985 0
 11981  11982 -11983  1116 -11986 0

c  0-1 --> -1
c    (-b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧ -p_1116) -> ( b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0)
c  in CNF:
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨  b^{12, 94}_2
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_1
c     b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨  b^{12, 94}_0
c  in DIMACS:
 11981  11982  11983  1116  11984 0
 11981  11982  11983  1116 -11985 0
 11981  11982  11983  1116  11986 0

c  -1-1 --> -2
c    ( b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧  b^{12, 93}_0 ∧ -p_1116) -> ( b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0)
c  in CNF:
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨  b^{12, 94}_2
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨  b^{12, 94}_1
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨  p_1116 ∨ -b^{12, 94}_0
c  in DIMACS:
-11981  11982 -11983  1116  11984 0
-11981  11982 -11983  1116  11985 0
-11981  11982 -11983  1116 -11986 0

c  -2-1 --> break 
c    ( b^{12, 93}_2 ∧  b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨  b^{12, 93}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-11981 -11982  11983  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 93}_2 ∧ -b^{12, 93}_1 ∧ -b^{12, 93}_0 ∧ true) 
c  in CNF:
c    -b^{12, 93}_2 ∨  b^{12, 93}_1 ∨  b^{12, 93}_0 ∨ false 
c  in DIMACS:
-11981  11982  11983  0

c  3 does not represent an automaton state.
c    -(-b^{12, 93}_2 ∧  b^{12, 93}_1 ∧  b^{12, 93}_0 ∧ true) 
c  in CNF:
c     b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ false 
c  in DIMACS:
 11981 -11982 -11983  0
c  -3 does not represent an automaton state.
c    -( b^{12, 93}_2 ∧  b^{12, 93}_1 ∧  b^{12, 93}_0 ∧ true) 
c  in CNF:
c    -b^{12, 93}_2 ∨ -b^{12, 93}_1 ∨ -b^{12, 93}_0 ∨ false 
c  in DIMACS:
-11981 -11982 -11983  0

c i = 94
c  -2+1 --> -1
c    ( b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧  p_1128) -> ( b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0)
c  in CNF:
c    -b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨  b^{12, 95}_2
c    -b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_1
c    -b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨  b^{12, 95}_0
c  in DIMACS:
-11984 -11985  11986 -1128  11987 0
-11984 -11985  11986 -1128 -11988 0
-11984 -11985  11986 -1128  11989 0

c  -1+1 --> 0
c    ( b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0 ∧  p_1128) -> (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧ -b^{12, 95}_0)
c  in CNF:
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_2
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_1
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_0
c  in DIMACS:
-11984  11985 -11986 -1128 -11987 0
-11984  11985 -11986 -1128 -11988 0
-11984  11985 -11986 -1128 -11989 0

c  0+1 --> 1
c    (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧  p_1128) -> (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0)
c  in CNF:
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_2
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_1
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨  b^{12, 95}_0
c  in DIMACS:
 11984  11985  11986 -1128 -11987 0
 11984  11985  11986 -1128 -11988 0
 11984  11985  11986 -1128  11989 0

c  1+1 --> 2
c    (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0 ∧  p_1128) -> (-b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0)
c  in CNF:
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_2
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨  b^{12, 95}_1
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ -p_1128 ∨ -b^{12, 95}_0
c  in DIMACS:
 11984  11985 -11986 -1128 -11987 0
 11984  11985 -11986 -1128  11988 0
 11984  11985 -11986 -1128 -11989 0

c  2+1 --> break 
c    (-b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 11984 -11985  11986 -1128 1162 0


c  2-1 --> 1
c    (-b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧ -p_1128) -> (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0)
c  in CNF:
c     b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_2
c     b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_1
c     b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨  b^{12, 95}_0
c  in DIMACS:
 11984 -11985  11986  1128 -11987 0
 11984 -11985  11986  1128 -11988 0
 11984 -11985  11986  1128  11989 0

c  1-1 --> 0
c    (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0 ∧ -p_1128) -> (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧ -b^{12, 95}_0)
c  in CNF:
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_2
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_1
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_0
c  in DIMACS:
 11984  11985 -11986  1128 -11987 0
 11984  11985 -11986  1128 -11988 0
 11984  11985 -11986  1128 -11989 0

c  0-1 --> -1
c    (-b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧ -p_1128) -> ( b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0)
c  in CNF:
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨  b^{12, 95}_2
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_1
c     b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨  b^{12, 95}_0
c  in DIMACS:
 11984  11985  11986  1128  11987 0
 11984  11985  11986  1128 -11988 0
 11984  11985  11986  1128  11989 0

c  -1-1 --> -2
c    ( b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧  b^{12, 94}_0 ∧ -p_1128) -> ( b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0)
c  in CNF:
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨  b^{12, 95}_2
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨  b^{12, 95}_1
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨  p_1128 ∨ -b^{12, 95}_0
c  in DIMACS:
-11984  11985 -11986  1128  11987 0
-11984  11985 -11986  1128  11988 0
-11984  11985 -11986  1128 -11989 0

c  -2-1 --> break 
c    ( b^{12, 94}_2 ∧  b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨  b^{12, 94}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-11984 -11985  11986  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 94}_2 ∧ -b^{12, 94}_1 ∧ -b^{12, 94}_0 ∧ true) 
c  in CNF:
c    -b^{12, 94}_2 ∨  b^{12, 94}_1 ∨  b^{12, 94}_0 ∨ false 
c  in DIMACS:
-11984  11985  11986  0

c  3 does not represent an automaton state.
c    -(-b^{12, 94}_2 ∧  b^{12, 94}_1 ∧  b^{12, 94}_0 ∧ true) 
c  in CNF:
c     b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ false 
c  in DIMACS:
 11984 -11985 -11986  0
c  -3 does not represent an automaton state.
c    -( b^{12, 94}_2 ∧  b^{12, 94}_1 ∧  b^{12, 94}_0 ∧ true) 
c  in CNF:
c    -b^{12, 94}_2 ∨ -b^{12, 94}_1 ∨ -b^{12, 94}_0 ∨ false 
c  in DIMACS:
-11984 -11985 -11986  0

c i = 95
c  -2+1 --> -1
c    ( b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧  p_1140) -> ( b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0)
c  in CNF:
c    -b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨  b^{12, 96}_2
c    -b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_1
c    -b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨  b^{12, 96}_0
c  in DIMACS:
-11987 -11988  11989 -1140  11990 0
-11987 -11988  11989 -1140 -11991 0
-11987 -11988  11989 -1140  11992 0

c  -1+1 --> 0
c    ( b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0 ∧  p_1140) -> (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧ -b^{12, 96}_0)
c  in CNF:
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_2
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_1
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_0
c  in DIMACS:
-11987  11988 -11989 -1140 -11990 0
-11987  11988 -11989 -1140 -11991 0
-11987  11988 -11989 -1140 -11992 0

c  0+1 --> 1
c    (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧  p_1140) -> (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0)
c  in CNF:
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_2
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_1
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨  b^{12, 96}_0
c  in DIMACS:
 11987  11988  11989 -1140 -11990 0
 11987  11988  11989 -1140 -11991 0
 11987  11988  11989 -1140  11992 0

c  1+1 --> 2
c    (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0 ∧  p_1140) -> (-b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0)
c  in CNF:
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_2
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨  b^{12, 96}_1
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ -p_1140 ∨ -b^{12, 96}_0
c  in DIMACS:
 11987  11988 -11989 -1140 -11990 0
 11987  11988 -11989 -1140  11991 0
 11987  11988 -11989 -1140 -11992 0

c  2+1 --> break 
c    (-b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 11987 -11988  11989 -1140 1162 0


c  2-1 --> 1
c    (-b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧ -p_1140) -> (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0)
c  in CNF:
c     b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_2
c     b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_1
c     b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨  b^{12, 96}_0
c  in DIMACS:
 11987 -11988  11989  1140 -11990 0
 11987 -11988  11989  1140 -11991 0
 11987 -11988  11989  1140  11992 0

c  1-1 --> 0
c    (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0 ∧ -p_1140) -> (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧ -b^{12, 96}_0)
c  in CNF:
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_2
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_1
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_0
c  in DIMACS:
 11987  11988 -11989  1140 -11990 0
 11987  11988 -11989  1140 -11991 0
 11987  11988 -11989  1140 -11992 0

c  0-1 --> -1
c    (-b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧ -p_1140) -> ( b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0)
c  in CNF:
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨  b^{12, 96}_2
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_1
c     b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨  b^{12, 96}_0
c  in DIMACS:
 11987  11988  11989  1140  11990 0
 11987  11988  11989  1140 -11991 0
 11987  11988  11989  1140  11992 0

c  -1-1 --> -2
c    ( b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧  b^{12, 95}_0 ∧ -p_1140) -> ( b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0)
c  in CNF:
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨  b^{12, 96}_2
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨  b^{12, 96}_1
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨  p_1140 ∨ -b^{12, 96}_0
c  in DIMACS:
-11987  11988 -11989  1140  11990 0
-11987  11988 -11989  1140  11991 0
-11987  11988 -11989  1140 -11992 0

c  -2-1 --> break 
c    ( b^{12, 95}_2 ∧  b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨  b^{12, 95}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-11987 -11988  11989  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 95}_2 ∧ -b^{12, 95}_1 ∧ -b^{12, 95}_0 ∧ true) 
c  in CNF:
c    -b^{12, 95}_2 ∨  b^{12, 95}_1 ∨  b^{12, 95}_0 ∨ false 
c  in DIMACS:
-11987  11988  11989  0

c  3 does not represent an automaton state.
c    -(-b^{12, 95}_2 ∧  b^{12, 95}_1 ∧  b^{12, 95}_0 ∧ true) 
c  in CNF:
c     b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ false 
c  in DIMACS:
 11987 -11988 -11989  0
c  -3 does not represent an automaton state.
c    -( b^{12, 95}_2 ∧  b^{12, 95}_1 ∧  b^{12, 95}_0 ∧ true) 
c  in CNF:
c    -b^{12, 95}_2 ∨ -b^{12, 95}_1 ∨ -b^{12, 95}_0 ∨ false 
c  in DIMACS:
-11987 -11988 -11989  0

c i = 96
c  -2+1 --> -1
c    ( b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧  p_1152) -> ( b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧  b^{12, 97}_0)
c  in CNF:
c    -b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨  b^{12, 97}_2
c    -b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_1
c    -b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨  b^{12, 97}_0
c  in DIMACS:
-11990 -11991  11992 -1152  11993 0
-11990 -11991  11992 -1152 -11994 0
-11990 -11991  11992 -1152  11995 0

c  -1+1 --> 0
c    ( b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0 ∧  p_1152) -> (-b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧ -b^{12, 97}_0)
c  in CNF:
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_2
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_1
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_0
c  in DIMACS:
-11990  11991 -11992 -1152 -11993 0
-11990  11991 -11992 -1152 -11994 0
-11990  11991 -11992 -1152 -11995 0

c  0+1 --> 1
c    (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧  p_1152) -> (-b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧  b^{12, 97}_0)
c  in CNF:
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_2
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_1
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨  b^{12, 97}_0
c  in DIMACS:
 11990  11991  11992 -1152 -11993 0
 11990  11991  11992 -1152 -11994 0
 11990  11991  11992 -1152  11995 0

c  1+1 --> 2
c    (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0 ∧  p_1152) -> (-b^{12, 97}_2 ∧  b^{12, 97}_1 ∧ -b^{12, 97}_0)
c  in CNF:
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_2
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨  b^{12, 97}_1
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ -p_1152 ∨ -b^{12, 97}_0
c  in DIMACS:
 11990  11991 -11992 -1152 -11993 0
 11990  11991 -11992 -1152  11994 0
 11990  11991 -11992 -1152 -11995 0

c  2+1 --> break 
c    (-b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 11990 -11991  11992 -1152 1162 0


c  2-1 --> 1
c    (-b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧ -p_1152) -> (-b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧  b^{12, 97}_0)
c  in CNF:
c     b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_2
c     b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_1
c     b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨  b^{12, 97}_0
c  in DIMACS:
 11990 -11991  11992  1152 -11993 0
 11990 -11991  11992  1152 -11994 0
 11990 -11991  11992  1152  11995 0

c  1-1 --> 0
c    (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0 ∧ -p_1152) -> (-b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧ -b^{12, 97}_0)
c  in CNF:
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_2
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_1
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_0
c  in DIMACS:
 11990  11991 -11992  1152 -11993 0
 11990  11991 -11992  1152 -11994 0
 11990  11991 -11992  1152 -11995 0

c  0-1 --> -1
c    (-b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧ -p_1152) -> ( b^{12, 97}_2 ∧ -b^{12, 97}_1 ∧  b^{12, 97}_0)
c  in CNF:
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨  b^{12, 97}_2
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_1
c     b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨  b^{12, 97}_0
c  in DIMACS:
 11990  11991  11992  1152  11993 0
 11990  11991  11992  1152 -11994 0
 11990  11991  11992  1152  11995 0

c  -1-1 --> -2
c    ( b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧  b^{12, 96}_0 ∧ -p_1152) -> ( b^{12, 97}_2 ∧  b^{12, 97}_1 ∧ -b^{12, 97}_0)
c  in CNF:
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨  b^{12, 97}_2
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨  b^{12, 97}_1
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨  p_1152 ∨ -b^{12, 97}_0
c  in DIMACS:
-11990  11991 -11992  1152  11993 0
-11990  11991 -11992  1152  11994 0
-11990  11991 -11992  1152 -11995 0

c  -2-1 --> break 
c    ( b^{12, 96}_2 ∧  b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨  b^{12, 96}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-11990 -11991  11992  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{12, 96}_2 ∧ -b^{12, 96}_1 ∧ -b^{12, 96}_0 ∧ true) 
c  in CNF:
c    -b^{12, 96}_2 ∨  b^{12, 96}_1 ∨  b^{12, 96}_0 ∨ false 
c  in DIMACS:
-11990  11991  11992  0

c  3 does not represent an automaton state.
c    -(-b^{12, 96}_2 ∧  b^{12, 96}_1 ∧  b^{12, 96}_0 ∧ true) 
c  in CNF:
c     b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ false 
c  in DIMACS:
 11990 -11991 -11992  0
c  -3 does not represent an automaton state.
c    -( b^{12, 96}_2 ∧  b^{12, 96}_1 ∧  b^{12, 96}_0 ∧ true) 
c  in CNF:
c    -b^{12, 96}_2 ∨ -b^{12, 96}_1 ∨ -b^{12, 96}_0 ∨ false 
c  in DIMACS:
-11990 -11991 -11992  0

c INIT for k = 13
c    -b^{13, 1}_2
c    -b^{13, 1}_1
c    -b^{13, 1}_0
c  in DIMACS:
-11996 0
-11997 0
-11998 0

c Transitions for k = 13
c i = 1
c  -2+1 --> -1
c    ( b^{13, 1}_2 ∧  b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧  p_13) -> ( b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0)
c  in CNF:
c    -b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨  b^{13, 2}_2
c    -b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_1
c    -b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨  b^{13, 2}_0
c  in DIMACS:
-11996 -11997  11998 -13  11999 0
-11996 -11997  11998 -13 -12000 0
-11996 -11997  11998 -13  12001 0

c  -1+1 --> 0
c    ( b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧  b^{13, 1}_0 ∧  p_13) -> (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧ -b^{13, 2}_0)
c  in CNF:
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_2
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_1
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_0
c  in DIMACS:
-11996  11997 -11998 -13 -11999 0
-11996  11997 -11998 -13 -12000 0
-11996  11997 -11998 -13 -12001 0

c  0+1 --> 1
c    (-b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧  p_13) -> (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0)
c  in CNF:
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_2
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_1
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨  b^{13, 2}_0
c  in DIMACS:
 11996  11997  11998 -13 -11999 0
 11996  11997  11998 -13 -12000 0
 11996  11997  11998 -13  12001 0

c  1+1 --> 2
c    (-b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧  b^{13, 1}_0 ∧  p_13) -> (-b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0)
c  in CNF:
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_2
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨  b^{13, 2}_1
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ -p_13 ∨ -b^{13, 2}_0
c  in DIMACS:
 11996  11997 -11998 -13 -11999 0
 11996  11997 -11998 -13  12000 0
 11996  11997 -11998 -13 -12001 0

c  2+1 --> break 
c    (-b^{13, 1}_2 ∧  b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧  p_13) -> break
c  in CNF:
c     b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ -p_13 ∨ break
c  in DIMACS:
 11996 -11997  11998 -13 1162 0


c  2-1 --> 1
c    (-b^{13, 1}_2 ∧  b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧ -p_13) -> (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0)
c  in CNF:
c     b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_2
c     b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_1
c     b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨  b^{13, 2}_0
c  in DIMACS:
 11996 -11997  11998  13 -11999 0
 11996 -11997  11998  13 -12000 0
 11996 -11997  11998  13  12001 0

c  1-1 --> 0
c    (-b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧  b^{13, 1}_0 ∧ -p_13) -> (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧ -b^{13, 2}_0)
c  in CNF:
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_2
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_1
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_0
c  in DIMACS:
 11996  11997 -11998  13 -11999 0
 11996  11997 -11998  13 -12000 0
 11996  11997 -11998  13 -12001 0

c  0-1 --> -1
c    (-b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧ -p_13) -> ( b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0)
c  in CNF:
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨  b^{13, 2}_2
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_1
c     b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨  b^{13, 2}_0
c  in DIMACS:
 11996  11997  11998  13  11999 0
 11996  11997  11998  13 -12000 0
 11996  11997  11998  13  12001 0

c  -1-1 --> -2
c    ( b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧  b^{13, 1}_0 ∧ -p_13) -> ( b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0)
c  in CNF:
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨  b^{13, 2}_2
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨  b^{13, 2}_1
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨  p_13 ∨ -b^{13, 2}_0
c  in DIMACS:
-11996  11997 -11998  13  11999 0
-11996  11997 -11998  13  12000 0
-11996  11997 -11998  13 -12001 0

c  -2-1 --> break 
c    ( b^{13, 1}_2 ∧  b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧ -p_13) -> break
c  in CNF:
c    -b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨  b^{13, 1}_0 ∨  p_13 ∨ break
c  in DIMACS:
-11996 -11997  11998  13 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 1}_2 ∧ -b^{13, 1}_1 ∧ -b^{13, 1}_0 ∧ true) 
c  in CNF:
c    -b^{13, 1}_2 ∨  b^{13, 1}_1 ∨  b^{13, 1}_0 ∨ false 
c  in DIMACS:
-11996  11997  11998  0

c  3 does not represent an automaton state.
c    -(-b^{13, 1}_2 ∧  b^{13, 1}_1 ∧  b^{13, 1}_0 ∧ true) 
c  in CNF:
c     b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ false 
c  in DIMACS:
 11996 -11997 -11998  0
c  -3 does not represent an automaton state.
c    -( b^{13, 1}_2 ∧  b^{13, 1}_1 ∧  b^{13, 1}_0 ∧ true) 
c  in CNF:
c    -b^{13, 1}_2 ∨ -b^{13, 1}_1 ∨ -b^{13, 1}_0 ∨ false 
c  in DIMACS:
-11996 -11997 -11998  0

c i = 2
c  -2+1 --> -1
c    ( b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧  p_26) -> ( b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0)
c  in CNF:
c    -b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨  b^{13, 3}_2
c    -b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_1
c    -b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨  b^{13, 3}_0
c  in DIMACS:
-11999 -12000  12001 -26  12002 0
-11999 -12000  12001 -26 -12003 0
-11999 -12000  12001 -26  12004 0

c  -1+1 --> 0
c    ( b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0 ∧  p_26) -> (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧ -b^{13, 3}_0)
c  in CNF:
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_2
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_1
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_0
c  in DIMACS:
-11999  12000 -12001 -26 -12002 0
-11999  12000 -12001 -26 -12003 0
-11999  12000 -12001 -26 -12004 0

c  0+1 --> 1
c    (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧  p_26) -> (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0)
c  in CNF:
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_2
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_1
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨  b^{13, 3}_0
c  in DIMACS:
 11999  12000  12001 -26 -12002 0
 11999  12000  12001 -26 -12003 0
 11999  12000  12001 -26  12004 0

c  1+1 --> 2
c    (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0 ∧  p_26) -> (-b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0)
c  in CNF:
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_2
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨  b^{13, 3}_1
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ -p_26 ∨ -b^{13, 3}_0
c  in DIMACS:
 11999  12000 -12001 -26 -12002 0
 11999  12000 -12001 -26  12003 0
 11999  12000 -12001 -26 -12004 0

c  2+1 --> break 
c    (-b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧  p_26) -> break
c  in CNF:
c     b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ -p_26 ∨ break
c  in DIMACS:
 11999 -12000  12001 -26 1162 0


c  2-1 --> 1
c    (-b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧ -p_26) -> (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0)
c  in CNF:
c     b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_2
c     b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_1
c     b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨  b^{13, 3}_0
c  in DIMACS:
 11999 -12000  12001  26 -12002 0
 11999 -12000  12001  26 -12003 0
 11999 -12000  12001  26  12004 0

c  1-1 --> 0
c    (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0 ∧ -p_26) -> (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧ -b^{13, 3}_0)
c  in CNF:
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_2
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_1
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_0
c  in DIMACS:
 11999  12000 -12001  26 -12002 0
 11999  12000 -12001  26 -12003 0
 11999  12000 -12001  26 -12004 0

c  0-1 --> -1
c    (-b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧ -p_26) -> ( b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0)
c  in CNF:
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨  b^{13, 3}_2
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_1
c     b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨  b^{13, 3}_0
c  in DIMACS:
 11999  12000  12001  26  12002 0
 11999  12000  12001  26 -12003 0
 11999  12000  12001  26  12004 0

c  -1-1 --> -2
c    ( b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧  b^{13, 2}_0 ∧ -p_26) -> ( b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0)
c  in CNF:
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨  b^{13, 3}_2
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨  b^{13, 3}_1
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨  p_26 ∨ -b^{13, 3}_0
c  in DIMACS:
-11999  12000 -12001  26  12002 0
-11999  12000 -12001  26  12003 0
-11999  12000 -12001  26 -12004 0

c  -2-1 --> break 
c    ( b^{13, 2}_2 ∧  b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧ -p_26) -> break
c  in CNF:
c    -b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨  b^{13, 2}_0 ∨  p_26 ∨ break
c  in DIMACS:
-11999 -12000  12001  26 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 2}_2 ∧ -b^{13, 2}_1 ∧ -b^{13, 2}_0 ∧ true) 
c  in CNF:
c    -b^{13, 2}_2 ∨  b^{13, 2}_1 ∨  b^{13, 2}_0 ∨ false 
c  in DIMACS:
-11999  12000  12001  0

c  3 does not represent an automaton state.
c    -(-b^{13, 2}_2 ∧  b^{13, 2}_1 ∧  b^{13, 2}_0 ∧ true) 
c  in CNF:
c     b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ false 
c  in DIMACS:
 11999 -12000 -12001  0
c  -3 does not represent an automaton state.
c    -( b^{13, 2}_2 ∧  b^{13, 2}_1 ∧  b^{13, 2}_0 ∧ true) 
c  in CNF:
c    -b^{13, 2}_2 ∨ -b^{13, 2}_1 ∨ -b^{13, 2}_0 ∨ false 
c  in DIMACS:
-11999 -12000 -12001  0

c i = 3
c  -2+1 --> -1
c    ( b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧  p_39) -> ( b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0)
c  in CNF:
c    -b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨  b^{13, 4}_2
c    -b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_1
c    -b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨  b^{13, 4}_0
c  in DIMACS:
-12002 -12003  12004 -39  12005 0
-12002 -12003  12004 -39 -12006 0
-12002 -12003  12004 -39  12007 0

c  -1+1 --> 0
c    ( b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0 ∧  p_39) -> (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧ -b^{13, 4}_0)
c  in CNF:
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_2
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_1
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_0
c  in DIMACS:
-12002  12003 -12004 -39 -12005 0
-12002  12003 -12004 -39 -12006 0
-12002  12003 -12004 -39 -12007 0

c  0+1 --> 1
c    (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧  p_39) -> (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0)
c  in CNF:
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_2
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_1
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨  b^{13, 4}_0
c  in DIMACS:
 12002  12003  12004 -39 -12005 0
 12002  12003  12004 -39 -12006 0
 12002  12003  12004 -39  12007 0

c  1+1 --> 2
c    (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0 ∧  p_39) -> (-b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0)
c  in CNF:
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_2
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨  b^{13, 4}_1
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ -p_39 ∨ -b^{13, 4}_0
c  in DIMACS:
 12002  12003 -12004 -39 -12005 0
 12002  12003 -12004 -39  12006 0
 12002  12003 -12004 -39 -12007 0

c  2+1 --> break 
c    (-b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧  p_39) -> break
c  in CNF:
c     b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ -p_39 ∨ break
c  in DIMACS:
 12002 -12003  12004 -39 1162 0


c  2-1 --> 1
c    (-b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧ -p_39) -> (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0)
c  in CNF:
c     b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_2
c     b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_1
c     b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨  b^{13, 4}_0
c  in DIMACS:
 12002 -12003  12004  39 -12005 0
 12002 -12003  12004  39 -12006 0
 12002 -12003  12004  39  12007 0

c  1-1 --> 0
c    (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0 ∧ -p_39) -> (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧ -b^{13, 4}_0)
c  in CNF:
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_2
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_1
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_0
c  in DIMACS:
 12002  12003 -12004  39 -12005 0
 12002  12003 -12004  39 -12006 0
 12002  12003 -12004  39 -12007 0

c  0-1 --> -1
c    (-b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧ -p_39) -> ( b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0)
c  in CNF:
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨  b^{13, 4}_2
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_1
c     b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨  b^{13, 4}_0
c  in DIMACS:
 12002  12003  12004  39  12005 0
 12002  12003  12004  39 -12006 0
 12002  12003  12004  39  12007 0

c  -1-1 --> -2
c    ( b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧  b^{13, 3}_0 ∧ -p_39) -> ( b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0)
c  in CNF:
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨  b^{13, 4}_2
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨  b^{13, 4}_1
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨  p_39 ∨ -b^{13, 4}_0
c  in DIMACS:
-12002  12003 -12004  39  12005 0
-12002  12003 -12004  39  12006 0
-12002  12003 -12004  39 -12007 0

c  -2-1 --> break 
c    ( b^{13, 3}_2 ∧  b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧ -p_39) -> break
c  in CNF:
c    -b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨  b^{13, 3}_0 ∨  p_39 ∨ break
c  in DIMACS:
-12002 -12003  12004  39 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 3}_2 ∧ -b^{13, 3}_1 ∧ -b^{13, 3}_0 ∧ true) 
c  in CNF:
c    -b^{13, 3}_2 ∨  b^{13, 3}_1 ∨  b^{13, 3}_0 ∨ false 
c  in DIMACS:
-12002  12003  12004  0

c  3 does not represent an automaton state.
c    -(-b^{13, 3}_2 ∧  b^{13, 3}_1 ∧  b^{13, 3}_0 ∧ true) 
c  in CNF:
c     b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ false 
c  in DIMACS:
 12002 -12003 -12004  0
c  -3 does not represent an automaton state.
c    -( b^{13, 3}_2 ∧  b^{13, 3}_1 ∧  b^{13, 3}_0 ∧ true) 
c  in CNF:
c    -b^{13, 3}_2 ∨ -b^{13, 3}_1 ∨ -b^{13, 3}_0 ∨ false 
c  in DIMACS:
-12002 -12003 -12004  0

c i = 4
c  -2+1 --> -1
c    ( b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧  p_52) -> ( b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0)
c  in CNF:
c    -b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨  b^{13, 5}_2
c    -b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_1
c    -b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨  b^{13, 5}_0
c  in DIMACS:
-12005 -12006  12007 -52  12008 0
-12005 -12006  12007 -52 -12009 0
-12005 -12006  12007 -52  12010 0

c  -1+1 --> 0
c    ( b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0 ∧  p_52) -> (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧ -b^{13, 5}_0)
c  in CNF:
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_2
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_1
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_0
c  in DIMACS:
-12005  12006 -12007 -52 -12008 0
-12005  12006 -12007 -52 -12009 0
-12005  12006 -12007 -52 -12010 0

c  0+1 --> 1
c    (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧  p_52) -> (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0)
c  in CNF:
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_2
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_1
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨  b^{13, 5}_0
c  in DIMACS:
 12005  12006  12007 -52 -12008 0
 12005  12006  12007 -52 -12009 0
 12005  12006  12007 -52  12010 0

c  1+1 --> 2
c    (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0 ∧  p_52) -> (-b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0)
c  in CNF:
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_2
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨  b^{13, 5}_1
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ -p_52 ∨ -b^{13, 5}_0
c  in DIMACS:
 12005  12006 -12007 -52 -12008 0
 12005  12006 -12007 -52  12009 0
 12005  12006 -12007 -52 -12010 0

c  2+1 --> break 
c    (-b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧  p_52) -> break
c  in CNF:
c     b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 12005 -12006  12007 -52 1162 0


c  2-1 --> 1
c    (-b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧ -p_52) -> (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0)
c  in CNF:
c     b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_2
c     b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_1
c     b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨  b^{13, 5}_0
c  in DIMACS:
 12005 -12006  12007  52 -12008 0
 12005 -12006  12007  52 -12009 0
 12005 -12006  12007  52  12010 0

c  1-1 --> 0
c    (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0 ∧ -p_52) -> (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧ -b^{13, 5}_0)
c  in CNF:
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_2
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_1
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_0
c  in DIMACS:
 12005  12006 -12007  52 -12008 0
 12005  12006 -12007  52 -12009 0
 12005  12006 -12007  52 -12010 0

c  0-1 --> -1
c    (-b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧ -p_52) -> ( b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0)
c  in CNF:
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨  b^{13, 5}_2
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_1
c     b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨  b^{13, 5}_0
c  in DIMACS:
 12005  12006  12007  52  12008 0
 12005  12006  12007  52 -12009 0
 12005  12006  12007  52  12010 0

c  -1-1 --> -2
c    ( b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧  b^{13, 4}_0 ∧ -p_52) -> ( b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0)
c  in CNF:
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨  b^{13, 5}_2
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨  b^{13, 5}_1
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨  p_52 ∨ -b^{13, 5}_0
c  in DIMACS:
-12005  12006 -12007  52  12008 0
-12005  12006 -12007  52  12009 0
-12005  12006 -12007  52 -12010 0

c  -2-1 --> break 
c    ( b^{13, 4}_2 ∧  b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨  b^{13, 4}_0 ∨  p_52 ∨ break
c  in DIMACS:
-12005 -12006  12007  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 4}_2 ∧ -b^{13, 4}_1 ∧ -b^{13, 4}_0 ∧ true) 
c  in CNF:
c    -b^{13, 4}_2 ∨  b^{13, 4}_1 ∨  b^{13, 4}_0 ∨ false 
c  in DIMACS:
-12005  12006  12007  0

c  3 does not represent an automaton state.
c    -(-b^{13, 4}_2 ∧  b^{13, 4}_1 ∧  b^{13, 4}_0 ∧ true) 
c  in CNF:
c     b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ false 
c  in DIMACS:
 12005 -12006 -12007  0
c  -3 does not represent an automaton state.
c    -( b^{13, 4}_2 ∧  b^{13, 4}_1 ∧  b^{13, 4}_0 ∧ true) 
c  in CNF:
c    -b^{13, 4}_2 ∨ -b^{13, 4}_1 ∨ -b^{13, 4}_0 ∨ false 
c  in DIMACS:
-12005 -12006 -12007  0

c i = 5
c  -2+1 --> -1
c    ( b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧  p_65) -> ( b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0)
c  in CNF:
c    -b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨  b^{13, 6}_2
c    -b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_1
c    -b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨  b^{13, 6}_0
c  in DIMACS:
-12008 -12009  12010 -65  12011 0
-12008 -12009  12010 -65 -12012 0
-12008 -12009  12010 -65  12013 0

c  -1+1 --> 0
c    ( b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0 ∧  p_65) -> (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧ -b^{13, 6}_0)
c  in CNF:
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_2
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_1
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_0
c  in DIMACS:
-12008  12009 -12010 -65 -12011 0
-12008  12009 -12010 -65 -12012 0
-12008  12009 -12010 -65 -12013 0

c  0+1 --> 1
c    (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧  p_65) -> (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0)
c  in CNF:
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_2
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_1
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨  b^{13, 6}_0
c  in DIMACS:
 12008  12009  12010 -65 -12011 0
 12008  12009  12010 -65 -12012 0
 12008  12009  12010 -65  12013 0

c  1+1 --> 2
c    (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0 ∧  p_65) -> (-b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0)
c  in CNF:
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_2
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨  b^{13, 6}_1
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ -p_65 ∨ -b^{13, 6}_0
c  in DIMACS:
 12008  12009 -12010 -65 -12011 0
 12008  12009 -12010 -65  12012 0
 12008  12009 -12010 -65 -12013 0

c  2+1 --> break 
c    (-b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧  p_65) -> break
c  in CNF:
c     b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ -p_65 ∨ break
c  in DIMACS:
 12008 -12009  12010 -65 1162 0


c  2-1 --> 1
c    (-b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧ -p_65) -> (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0)
c  in CNF:
c     b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_2
c     b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_1
c     b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨  b^{13, 6}_0
c  in DIMACS:
 12008 -12009  12010  65 -12011 0
 12008 -12009  12010  65 -12012 0
 12008 -12009  12010  65  12013 0

c  1-1 --> 0
c    (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0 ∧ -p_65) -> (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧ -b^{13, 6}_0)
c  in CNF:
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_2
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_1
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_0
c  in DIMACS:
 12008  12009 -12010  65 -12011 0
 12008  12009 -12010  65 -12012 0
 12008  12009 -12010  65 -12013 0

c  0-1 --> -1
c    (-b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧ -p_65) -> ( b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0)
c  in CNF:
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨  b^{13, 6}_2
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_1
c     b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨  b^{13, 6}_0
c  in DIMACS:
 12008  12009  12010  65  12011 0
 12008  12009  12010  65 -12012 0
 12008  12009  12010  65  12013 0

c  -1-1 --> -2
c    ( b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧  b^{13, 5}_0 ∧ -p_65) -> ( b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0)
c  in CNF:
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨  b^{13, 6}_2
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨  b^{13, 6}_1
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨  p_65 ∨ -b^{13, 6}_0
c  in DIMACS:
-12008  12009 -12010  65  12011 0
-12008  12009 -12010  65  12012 0
-12008  12009 -12010  65 -12013 0

c  -2-1 --> break 
c    ( b^{13, 5}_2 ∧  b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧ -p_65) -> break
c  in CNF:
c    -b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨  b^{13, 5}_0 ∨  p_65 ∨ break
c  in DIMACS:
-12008 -12009  12010  65 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 5}_2 ∧ -b^{13, 5}_1 ∧ -b^{13, 5}_0 ∧ true) 
c  in CNF:
c    -b^{13, 5}_2 ∨  b^{13, 5}_1 ∨  b^{13, 5}_0 ∨ false 
c  in DIMACS:
-12008  12009  12010  0

c  3 does not represent an automaton state.
c    -(-b^{13, 5}_2 ∧  b^{13, 5}_1 ∧  b^{13, 5}_0 ∧ true) 
c  in CNF:
c     b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ false 
c  in DIMACS:
 12008 -12009 -12010  0
c  -3 does not represent an automaton state.
c    -( b^{13, 5}_2 ∧  b^{13, 5}_1 ∧  b^{13, 5}_0 ∧ true) 
c  in CNF:
c    -b^{13, 5}_2 ∨ -b^{13, 5}_1 ∨ -b^{13, 5}_0 ∨ false 
c  in DIMACS:
-12008 -12009 -12010  0

c i = 6
c  -2+1 --> -1
c    ( b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧  p_78) -> ( b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0)
c  in CNF:
c    -b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨  b^{13, 7}_2
c    -b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_1
c    -b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨  b^{13, 7}_0
c  in DIMACS:
-12011 -12012  12013 -78  12014 0
-12011 -12012  12013 -78 -12015 0
-12011 -12012  12013 -78  12016 0

c  -1+1 --> 0
c    ( b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0 ∧  p_78) -> (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧ -b^{13, 7}_0)
c  in CNF:
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_2
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_1
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_0
c  in DIMACS:
-12011  12012 -12013 -78 -12014 0
-12011  12012 -12013 -78 -12015 0
-12011  12012 -12013 -78 -12016 0

c  0+1 --> 1
c    (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧  p_78) -> (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0)
c  in CNF:
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_2
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_1
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨  b^{13, 7}_0
c  in DIMACS:
 12011  12012  12013 -78 -12014 0
 12011  12012  12013 -78 -12015 0
 12011  12012  12013 -78  12016 0

c  1+1 --> 2
c    (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0 ∧  p_78) -> (-b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0)
c  in CNF:
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_2
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨  b^{13, 7}_1
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ -p_78 ∨ -b^{13, 7}_0
c  in DIMACS:
 12011  12012 -12013 -78 -12014 0
 12011  12012 -12013 -78  12015 0
 12011  12012 -12013 -78 -12016 0

c  2+1 --> break 
c    (-b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧  p_78) -> break
c  in CNF:
c     b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 12011 -12012  12013 -78 1162 0


c  2-1 --> 1
c    (-b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧ -p_78) -> (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0)
c  in CNF:
c     b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_2
c     b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_1
c     b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨  b^{13, 7}_0
c  in DIMACS:
 12011 -12012  12013  78 -12014 0
 12011 -12012  12013  78 -12015 0
 12011 -12012  12013  78  12016 0

c  1-1 --> 0
c    (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0 ∧ -p_78) -> (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧ -b^{13, 7}_0)
c  in CNF:
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_2
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_1
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_0
c  in DIMACS:
 12011  12012 -12013  78 -12014 0
 12011  12012 -12013  78 -12015 0
 12011  12012 -12013  78 -12016 0

c  0-1 --> -1
c    (-b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧ -p_78) -> ( b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0)
c  in CNF:
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨  b^{13, 7}_2
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_1
c     b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨  b^{13, 7}_0
c  in DIMACS:
 12011  12012  12013  78  12014 0
 12011  12012  12013  78 -12015 0
 12011  12012  12013  78  12016 0

c  -1-1 --> -2
c    ( b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧  b^{13, 6}_0 ∧ -p_78) -> ( b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0)
c  in CNF:
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨  b^{13, 7}_2
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨  b^{13, 7}_1
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨  p_78 ∨ -b^{13, 7}_0
c  in DIMACS:
-12011  12012 -12013  78  12014 0
-12011  12012 -12013  78  12015 0
-12011  12012 -12013  78 -12016 0

c  -2-1 --> break 
c    ( b^{13, 6}_2 ∧  b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨  b^{13, 6}_0 ∨  p_78 ∨ break
c  in DIMACS:
-12011 -12012  12013  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 6}_2 ∧ -b^{13, 6}_1 ∧ -b^{13, 6}_0 ∧ true) 
c  in CNF:
c    -b^{13, 6}_2 ∨  b^{13, 6}_1 ∨  b^{13, 6}_0 ∨ false 
c  in DIMACS:
-12011  12012  12013  0

c  3 does not represent an automaton state.
c    -(-b^{13, 6}_2 ∧  b^{13, 6}_1 ∧  b^{13, 6}_0 ∧ true) 
c  in CNF:
c     b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ false 
c  in DIMACS:
 12011 -12012 -12013  0
c  -3 does not represent an automaton state.
c    -( b^{13, 6}_2 ∧  b^{13, 6}_1 ∧  b^{13, 6}_0 ∧ true) 
c  in CNF:
c    -b^{13, 6}_2 ∨ -b^{13, 6}_1 ∨ -b^{13, 6}_0 ∨ false 
c  in DIMACS:
-12011 -12012 -12013  0

c i = 7
c  -2+1 --> -1
c    ( b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧  p_91) -> ( b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0)
c  in CNF:
c    -b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨  b^{13, 8}_2
c    -b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_1
c    -b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨  b^{13, 8}_0
c  in DIMACS:
-12014 -12015  12016 -91  12017 0
-12014 -12015  12016 -91 -12018 0
-12014 -12015  12016 -91  12019 0

c  -1+1 --> 0
c    ( b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0 ∧  p_91) -> (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧ -b^{13, 8}_0)
c  in CNF:
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_2
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_1
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_0
c  in DIMACS:
-12014  12015 -12016 -91 -12017 0
-12014  12015 -12016 -91 -12018 0
-12014  12015 -12016 -91 -12019 0

c  0+1 --> 1
c    (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧  p_91) -> (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0)
c  in CNF:
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_2
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_1
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨  b^{13, 8}_0
c  in DIMACS:
 12014  12015  12016 -91 -12017 0
 12014  12015  12016 -91 -12018 0
 12014  12015  12016 -91  12019 0

c  1+1 --> 2
c    (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0 ∧  p_91) -> (-b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0)
c  in CNF:
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_2
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨  b^{13, 8}_1
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ -p_91 ∨ -b^{13, 8}_0
c  in DIMACS:
 12014  12015 -12016 -91 -12017 0
 12014  12015 -12016 -91  12018 0
 12014  12015 -12016 -91 -12019 0

c  2+1 --> break 
c    (-b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧  p_91) -> break
c  in CNF:
c     b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ -p_91 ∨ break
c  in DIMACS:
 12014 -12015  12016 -91 1162 0


c  2-1 --> 1
c    (-b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧ -p_91) -> (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0)
c  in CNF:
c     b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_2
c     b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_1
c     b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨  b^{13, 8}_0
c  in DIMACS:
 12014 -12015  12016  91 -12017 0
 12014 -12015  12016  91 -12018 0
 12014 -12015  12016  91  12019 0

c  1-1 --> 0
c    (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0 ∧ -p_91) -> (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧ -b^{13, 8}_0)
c  in CNF:
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_2
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_1
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_0
c  in DIMACS:
 12014  12015 -12016  91 -12017 0
 12014  12015 -12016  91 -12018 0
 12014  12015 -12016  91 -12019 0

c  0-1 --> -1
c    (-b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧ -p_91) -> ( b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0)
c  in CNF:
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨  b^{13, 8}_2
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_1
c     b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨  b^{13, 8}_0
c  in DIMACS:
 12014  12015  12016  91  12017 0
 12014  12015  12016  91 -12018 0
 12014  12015  12016  91  12019 0

c  -1-1 --> -2
c    ( b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧  b^{13, 7}_0 ∧ -p_91) -> ( b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0)
c  in CNF:
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨  b^{13, 8}_2
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨  b^{13, 8}_1
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨  p_91 ∨ -b^{13, 8}_0
c  in DIMACS:
-12014  12015 -12016  91  12017 0
-12014  12015 -12016  91  12018 0
-12014  12015 -12016  91 -12019 0

c  -2-1 --> break 
c    ( b^{13, 7}_2 ∧  b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧ -p_91) -> break
c  in CNF:
c    -b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨  b^{13, 7}_0 ∨  p_91 ∨ break
c  in DIMACS:
-12014 -12015  12016  91 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 7}_2 ∧ -b^{13, 7}_1 ∧ -b^{13, 7}_0 ∧ true) 
c  in CNF:
c    -b^{13, 7}_2 ∨  b^{13, 7}_1 ∨  b^{13, 7}_0 ∨ false 
c  in DIMACS:
-12014  12015  12016  0

c  3 does not represent an automaton state.
c    -(-b^{13, 7}_2 ∧  b^{13, 7}_1 ∧  b^{13, 7}_0 ∧ true) 
c  in CNF:
c     b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ false 
c  in DIMACS:
 12014 -12015 -12016  0
c  -3 does not represent an automaton state.
c    -( b^{13, 7}_2 ∧  b^{13, 7}_1 ∧  b^{13, 7}_0 ∧ true) 
c  in CNF:
c    -b^{13, 7}_2 ∨ -b^{13, 7}_1 ∨ -b^{13, 7}_0 ∨ false 
c  in DIMACS:
-12014 -12015 -12016  0

c i = 8
c  -2+1 --> -1
c    ( b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧  p_104) -> ( b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0)
c  in CNF:
c    -b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨  b^{13, 9}_2
c    -b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_1
c    -b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨  b^{13, 9}_0
c  in DIMACS:
-12017 -12018  12019 -104  12020 0
-12017 -12018  12019 -104 -12021 0
-12017 -12018  12019 -104  12022 0

c  -1+1 --> 0
c    ( b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0 ∧  p_104) -> (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧ -b^{13, 9}_0)
c  in CNF:
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_2
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_1
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_0
c  in DIMACS:
-12017  12018 -12019 -104 -12020 0
-12017  12018 -12019 -104 -12021 0
-12017  12018 -12019 -104 -12022 0

c  0+1 --> 1
c    (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧  p_104) -> (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0)
c  in CNF:
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_2
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_1
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨  b^{13, 9}_0
c  in DIMACS:
 12017  12018  12019 -104 -12020 0
 12017  12018  12019 -104 -12021 0
 12017  12018  12019 -104  12022 0

c  1+1 --> 2
c    (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0 ∧  p_104) -> (-b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0)
c  in CNF:
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_2
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨  b^{13, 9}_1
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ -p_104 ∨ -b^{13, 9}_0
c  in DIMACS:
 12017  12018 -12019 -104 -12020 0
 12017  12018 -12019 -104  12021 0
 12017  12018 -12019 -104 -12022 0

c  2+1 --> break 
c    (-b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧  p_104) -> break
c  in CNF:
c     b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 12017 -12018  12019 -104 1162 0


c  2-1 --> 1
c    (-b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧ -p_104) -> (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0)
c  in CNF:
c     b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_2
c     b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_1
c     b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨  b^{13, 9}_0
c  in DIMACS:
 12017 -12018  12019  104 -12020 0
 12017 -12018  12019  104 -12021 0
 12017 -12018  12019  104  12022 0

c  1-1 --> 0
c    (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0 ∧ -p_104) -> (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧ -b^{13, 9}_0)
c  in CNF:
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_2
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_1
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_0
c  in DIMACS:
 12017  12018 -12019  104 -12020 0
 12017  12018 -12019  104 -12021 0
 12017  12018 -12019  104 -12022 0

c  0-1 --> -1
c    (-b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧ -p_104) -> ( b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0)
c  in CNF:
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨  b^{13, 9}_2
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_1
c     b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨  b^{13, 9}_0
c  in DIMACS:
 12017  12018  12019  104  12020 0
 12017  12018  12019  104 -12021 0
 12017  12018  12019  104  12022 0

c  -1-1 --> -2
c    ( b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧  b^{13, 8}_0 ∧ -p_104) -> ( b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0)
c  in CNF:
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨  b^{13, 9}_2
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨  b^{13, 9}_1
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨  p_104 ∨ -b^{13, 9}_0
c  in DIMACS:
-12017  12018 -12019  104  12020 0
-12017  12018 -12019  104  12021 0
-12017  12018 -12019  104 -12022 0

c  -2-1 --> break 
c    ( b^{13, 8}_2 ∧  b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨  b^{13, 8}_0 ∨  p_104 ∨ break
c  in DIMACS:
-12017 -12018  12019  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 8}_2 ∧ -b^{13, 8}_1 ∧ -b^{13, 8}_0 ∧ true) 
c  in CNF:
c    -b^{13, 8}_2 ∨  b^{13, 8}_1 ∨  b^{13, 8}_0 ∨ false 
c  in DIMACS:
-12017  12018  12019  0

c  3 does not represent an automaton state.
c    -(-b^{13, 8}_2 ∧  b^{13, 8}_1 ∧  b^{13, 8}_0 ∧ true) 
c  in CNF:
c     b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ false 
c  in DIMACS:
 12017 -12018 -12019  0
c  -3 does not represent an automaton state.
c    -( b^{13, 8}_2 ∧  b^{13, 8}_1 ∧  b^{13, 8}_0 ∧ true) 
c  in CNF:
c    -b^{13, 8}_2 ∨ -b^{13, 8}_1 ∨ -b^{13, 8}_0 ∨ false 
c  in DIMACS:
-12017 -12018 -12019  0

c i = 9
c  -2+1 --> -1
c    ( b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧  p_117) -> ( b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0)
c  in CNF:
c    -b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨  b^{13, 10}_2
c    -b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_1
c    -b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨  b^{13, 10}_0
c  in DIMACS:
-12020 -12021  12022 -117  12023 0
-12020 -12021  12022 -117 -12024 0
-12020 -12021  12022 -117  12025 0

c  -1+1 --> 0
c    ( b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0 ∧  p_117) -> (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧ -b^{13, 10}_0)
c  in CNF:
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_2
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_1
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_0
c  in DIMACS:
-12020  12021 -12022 -117 -12023 0
-12020  12021 -12022 -117 -12024 0
-12020  12021 -12022 -117 -12025 0

c  0+1 --> 1
c    (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧  p_117) -> (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0)
c  in CNF:
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_2
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_1
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨  b^{13, 10}_0
c  in DIMACS:
 12020  12021  12022 -117 -12023 0
 12020  12021  12022 -117 -12024 0
 12020  12021  12022 -117  12025 0

c  1+1 --> 2
c    (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0 ∧  p_117) -> (-b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0)
c  in CNF:
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_2
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨  b^{13, 10}_1
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ -p_117 ∨ -b^{13, 10}_0
c  in DIMACS:
 12020  12021 -12022 -117 -12023 0
 12020  12021 -12022 -117  12024 0
 12020  12021 -12022 -117 -12025 0

c  2+1 --> break 
c    (-b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧  p_117) -> break
c  in CNF:
c     b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 12020 -12021  12022 -117 1162 0


c  2-1 --> 1
c    (-b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧ -p_117) -> (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0)
c  in CNF:
c     b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_2
c     b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_1
c     b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨  b^{13, 10}_0
c  in DIMACS:
 12020 -12021  12022  117 -12023 0
 12020 -12021  12022  117 -12024 0
 12020 -12021  12022  117  12025 0

c  1-1 --> 0
c    (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0 ∧ -p_117) -> (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧ -b^{13, 10}_0)
c  in CNF:
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_2
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_1
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_0
c  in DIMACS:
 12020  12021 -12022  117 -12023 0
 12020  12021 -12022  117 -12024 0
 12020  12021 -12022  117 -12025 0

c  0-1 --> -1
c    (-b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧ -p_117) -> ( b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0)
c  in CNF:
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨  b^{13, 10}_2
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_1
c     b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨  b^{13, 10}_0
c  in DIMACS:
 12020  12021  12022  117  12023 0
 12020  12021  12022  117 -12024 0
 12020  12021  12022  117  12025 0

c  -1-1 --> -2
c    ( b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧  b^{13, 9}_0 ∧ -p_117) -> ( b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0)
c  in CNF:
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨  b^{13, 10}_2
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨  b^{13, 10}_1
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨  p_117 ∨ -b^{13, 10}_0
c  in DIMACS:
-12020  12021 -12022  117  12023 0
-12020  12021 -12022  117  12024 0
-12020  12021 -12022  117 -12025 0

c  -2-1 --> break 
c    ( b^{13, 9}_2 ∧  b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨  b^{13, 9}_0 ∨  p_117 ∨ break
c  in DIMACS:
-12020 -12021  12022  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 9}_2 ∧ -b^{13, 9}_1 ∧ -b^{13, 9}_0 ∧ true) 
c  in CNF:
c    -b^{13, 9}_2 ∨  b^{13, 9}_1 ∨  b^{13, 9}_0 ∨ false 
c  in DIMACS:
-12020  12021  12022  0

c  3 does not represent an automaton state.
c    -(-b^{13, 9}_2 ∧  b^{13, 9}_1 ∧  b^{13, 9}_0 ∧ true) 
c  in CNF:
c     b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ false 
c  in DIMACS:
 12020 -12021 -12022  0
c  -3 does not represent an automaton state.
c    -( b^{13, 9}_2 ∧  b^{13, 9}_1 ∧  b^{13, 9}_0 ∧ true) 
c  in CNF:
c    -b^{13, 9}_2 ∨ -b^{13, 9}_1 ∨ -b^{13, 9}_0 ∨ false 
c  in DIMACS:
-12020 -12021 -12022  0

c i = 10
c  -2+1 --> -1
c    ( b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧  p_130) -> ( b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0)
c  in CNF:
c    -b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨  b^{13, 11}_2
c    -b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_1
c    -b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨  b^{13, 11}_0
c  in DIMACS:
-12023 -12024  12025 -130  12026 0
-12023 -12024  12025 -130 -12027 0
-12023 -12024  12025 -130  12028 0

c  -1+1 --> 0
c    ( b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0 ∧  p_130) -> (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧ -b^{13, 11}_0)
c  in CNF:
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_2
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_1
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_0
c  in DIMACS:
-12023  12024 -12025 -130 -12026 0
-12023  12024 -12025 -130 -12027 0
-12023  12024 -12025 -130 -12028 0

c  0+1 --> 1
c    (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧  p_130) -> (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0)
c  in CNF:
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_2
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_1
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨  b^{13, 11}_0
c  in DIMACS:
 12023  12024  12025 -130 -12026 0
 12023  12024  12025 -130 -12027 0
 12023  12024  12025 -130  12028 0

c  1+1 --> 2
c    (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0 ∧  p_130) -> (-b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0)
c  in CNF:
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_2
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨  b^{13, 11}_1
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ -p_130 ∨ -b^{13, 11}_0
c  in DIMACS:
 12023  12024 -12025 -130 -12026 0
 12023  12024 -12025 -130  12027 0
 12023  12024 -12025 -130 -12028 0

c  2+1 --> break 
c    (-b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧  p_130) -> break
c  in CNF:
c     b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 12023 -12024  12025 -130 1162 0


c  2-1 --> 1
c    (-b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧ -p_130) -> (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0)
c  in CNF:
c     b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_2
c     b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_1
c     b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨  b^{13, 11}_0
c  in DIMACS:
 12023 -12024  12025  130 -12026 0
 12023 -12024  12025  130 -12027 0
 12023 -12024  12025  130  12028 0

c  1-1 --> 0
c    (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0 ∧ -p_130) -> (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧ -b^{13, 11}_0)
c  in CNF:
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_2
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_1
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_0
c  in DIMACS:
 12023  12024 -12025  130 -12026 0
 12023  12024 -12025  130 -12027 0
 12023  12024 -12025  130 -12028 0

c  0-1 --> -1
c    (-b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧ -p_130) -> ( b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0)
c  in CNF:
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨  b^{13, 11}_2
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_1
c     b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨  b^{13, 11}_0
c  in DIMACS:
 12023  12024  12025  130  12026 0
 12023  12024  12025  130 -12027 0
 12023  12024  12025  130  12028 0

c  -1-1 --> -2
c    ( b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧  b^{13, 10}_0 ∧ -p_130) -> ( b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0)
c  in CNF:
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨  b^{13, 11}_2
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨  b^{13, 11}_1
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨  p_130 ∨ -b^{13, 11}_0
c  in DIMACS:
-12023  12024 -12025  130  12026 0
-12023  12024 -12025  130  12027 0
-12023  12024 -12025  130 -12028 0

c  -2-1 --> break 
c    ( b^{13, 10}_2 ∧  b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨  b^{13, 10}_0 ∨  p_130 ∨ break
c  in DIMACS:
-12023 -12024  12025  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 10}_2 ∧ -b^{13, 10}_1 ∧ -b^{13, 10}_0 ∧ true) 
c  in CNF:
c    -b^{13, 10}_2 ∨  b^{13, 10}_1 ∨  b^{13, 10}_0 ∨ false 
c  in DIMACS:
-12023  12024  12025  0

c  3 does not represent an automaton state.
c    -(-b^{13, 10}_2 ∧  b^{13, 10}_1 ∧  b^{13, 10}_0 ∧ true) 
c  in CNF:
c     b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ false 
c  in DIMACS:
 12023 -12024 -12025  0
c  -3 does not represent an automaton state.
c    -( b^{13, 10}_2 ∧  b^{13, 10}_1 ∧  b^{13, 10}_0 ∧ true) 
c  in CNF:
c    -b^{13, 10}_2 ∨ -b^{13, 10}_1 ∨ -b^{13, 10}_0 ∨ false 
c  in DIMACS:
-12023 -12024 -12025  0

c i = 11
c  -2+1 --> -1
c    ( b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧  p_143) -> ( b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0)
c  in CNF:
c    -b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨  b^{13, 12}_2
c    -b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_1
c    -b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨  b^{13, 12}_0
c  in DIMACS:
-12026 -12027  12028 -143  12029 0
-12026 -12027  12028 -143 -12030 0
-12026 -12027  12028 -143  12031 0

c  -1+1 --> 0
c    ( b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0 ∧  p_143) -> (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧ -b^{13, 12}_0)
c  in CNF:
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_2
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_1
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_0
c  in DIMACS:
-12026  12027 -12028 -143 -12029 0
-12026  12027 -12028 -143 -12030 0
-12026  12027 -12028 -143 -12031 0

c  0+1 --> 1
c    (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧  p_143) -> (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0)
c  in CNF:
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_2
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_1
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨  b^{13, 12}_0
c  in DIMACS:
 12026  12027  12028 -143 -12029 0
 12026  12027  12028 -143 -12030 0
 12026  12027  12028 -143  12031 0

c  1+1 --> 2
c    (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0 ∧  p_143) -> (-b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0)
c  in CNF:
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_2
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨  b^{13, 12}_1
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ -p_143 ∨ -b^{13, 12}_0
c  in DIMACS:
 12026  12027 -12028 -143 -12029 0
 12026  12027 -12028 -143  12030 0
 12026  12027 -12028 -143 -12031 0

c  2+1 --> break 
c    (-b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧  p_143) -> break
c  in CNF:
c     b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ -p_143 ∨ break
c  in DIMACS:
 12026 -12027  12028 -143 1162 0


c  2-1 --> 1
c    (-b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧ -p_143) -> (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0)
c  in CNF:
c     b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_2
c     b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_1
c     b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨  b^{13, 12}_0
c  in DIMACS:
 12026 -12027  12028  143 -12029 0
 12026 -12027  12028  143 -12030 0
 12026 -12027  12028  143  12031 0

c  1-1 --> 0
c    (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0 ∧ -p_143) -> (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧ -b^{13, 12}_0)
c  in CNF:
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_2
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_1
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_0
c  in DIMACS:
 12026  12027 -12028  143 -12029 0
 12026  12027 -12028  143 -12030 0
 12026  12027 -12028  143 -12031 0

c  0-1 --> -1
c    (-b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧ -p_143) -> ( b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0)
c  in CNF:
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨  b^{13, 12}_2
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_1
c     b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨  b^{13, 12}_0
c  in DIMACS:
 12026  12027  12028  143  12029 0
 12026  12027  12028  143 -12030 0
 12026  12027  12028  143  12031 0

c  -1-1 --> -2
c    ( b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧  b^{13, 11}_0 ∧ -p_143) -> ( b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0)
c  in CNF:
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨  b^{13, 12}_2
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨  b^{13, 12}_1
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨  p_143 ∨ -b^{13, 12}_0
c  in DIMACS:
-12026  12027 -12028  143  12029 0
-12026  12027 -12028  143  12030 0
-12026  12027 -12028  143 -12031 0

c  -2-1 --> break 
c    ( b^{13, 11}_2 ∧  b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧ -p_143) -> break
c  in CNF:
c    -b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨  b^{13, 11}_0 ∨  p_143 ∨ break
c  in DIMACS:
-12026 -12027  12028  143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 11}_2 ∧ -b^{13, 11}_1 ∧ -b^{13, 11}_0 ∧ true) 
c  in CNF:
c    -b^{13, 11}_2 ∨  b^{13, 11}_1 ∨  b^{13, 11}_0 ∨ false 
c  in DIMACS:
-12026  12027  12028  0

c  3 does not represent an automaton state.
c    -(-b^{13, 11}_2 ∧  b^{13, 11}_1 ∧  b^{13, 11}_0 ∧ true) 
c  in CNF:
c     b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ false 
c  in DIMACS:
 12026 -12027 -12028  0
c  -3 does not represent an automaton state.
c    -( b^{13, 11}_2 ∧  b^{13, 11}_1 ∧  b^{13, 11}_0 ∧ true) 
c  in CNF:
c    -b^{13, 11}_2 ∨ -b^{13, 11}_1 ∨ -b^{13, 11}_0 ∨ false 
c  in DIMACS:
-12026 -12027 -12028  0

c i = 12
c  -2+1 --> -1
c    ( b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧  p_156) -> ( b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0)
c  in CNF:
c    -b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨  b^{13, 13}_2
c    -b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_1
c    -b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨  b^{13, 13}_0
c  in DIMACS:
-12029 -12030  12031 -156  12032 0
-12029 -12030  12031 -156 -12033 0
-12029 -12030  12031 -156  12034 0

c  -1+1 --> 0
c    ( b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0 ∧  p_156) -> (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧ -b^{13, 13}_0)
c  in CNF:
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_2
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_1
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_0
c  in DIMACS:
-12029  12030 -12031 -156 -12032 0
-12029  12030 -12031 -156 -12033 0
-12029  12030 -12031 -156 -12034 0

c  0+1 --> 1
c    (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧  p_156) -> (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0)
c  in CNF:
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_2
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_1
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨  b^{13, 13}_0
c  in DIMACS:
 12029  12030  12031 -156 -12032 0
 12029  12030  12031 -156 -12033 0
 12029  12030  12031 -156  12034 0

c  1+1 --> 2
c    (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0 ∧  p_156) -> (-b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0)
c  in CNF:
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_2
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨  b^{13, 13}_1
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ -p_156 ∨ -b^{13, 13}_0
c  in DIMACS:
 12029  12030 -12031 -156 -12032 0
 12029  12030 -12031 -156  12033 0
 12029  12030 -12031 -156 -12034 0

c  2+1 --> break 
c    (-b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧  p_156) -> break
c  in CNF:
c     b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 12029 -12030  12031 -156 1162 0


c  2-1 --> 1
c    (-b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧ -p_156) -> (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0)
c  in CNF:
c     b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_2
c     b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_1
c     b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨  b^{13, 13}_0
c  in DIMACS:
 12029 -12030  12031  156 -12032 0
 12029 -12030  12031  156 -12033 0
 12029 -12030  12031  156  12034 0

c  1-1 --> 0
c    (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0 ∧ -p_156) -> (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧ -b^{13, 13}_0)
c  in CNF:
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_2
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_1
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_0
c  in DIMACS:
 12029  12030 -12031  156 -12032 0
 12029  12030 -12031  156 -12033 0
 12029  12030 -12031  156 -12034 0

c  0-1 --> -1
c    (-b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧ -p_156) -> ( b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0)
c  in CNF:
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨  b^{13, 13}_2
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_1
c     b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨  b^{13, 13}_0
c  in DIMACS:
 12029  12030  12031  156  12032 0
 12029  12030  12031  156 -12033 0
 12029  12030  12031  156  12034 0

c  -1-1 --> -2
c    ( b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧  b^{13, 12}_0 ∧ -p_156) -> ( b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0)
c  in CNF:
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨  b^{13, 13}_2
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨  b^{13, 13}_1
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨  p_156 ∨ -b^{13, 13}_0
c  in DIMACS:
-12029  12030 -12031  156  12032 0
-12029  12030 -12031  156  12033 0
-12029  12030 -12031  156 -12034 0

c  -2-1 --> break 
c    ( b^{13, 12}_2 ∧  b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨  b^{13, 12}_0 ∨  p_156 ∨ break
c  in DIMACS:
-12029 -12030  12031  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 12}_2 ∧ -b^{13, 12}_1 ∧ -b^{13, 12}_0 ∧ true) 
c  in CNF:
c    -b^{13, 12}_2 ∨  b^{13, 12}_1 ∨  b^{13, 12}_0 ∨ false 
c  in DIMACS:
-12029  12030  12031  0

c  3 does not represent an automaton state.
c    -(-b^{13, 12}_2 ∧  b^{13, 12}_1 ∧  b^{13, 12}_0 ∧ true) 
c  in CNF:
c     b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ false 
c  in DIMACS:
 12029 -12030 -12031  0
c  -3 does not represent an automaton state.
c    -( b^{13, 12}_2 ∧  b^{13, 12}_1 ∧  b^{13, 12}_0 ∧ true) 
c  in CNF:
c    -b^{13, 12}_2 ∨ -b^{13, 12}_1 ∨ -b^{13, 12}_0 ∨ false 
c  in DIMACS:
-12029 -12030 -12031  0

c i = 13
c  -2+1 --> -1
c    ( b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧  p_169) -> ( b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0)
c  in CNF:
c    -b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨  b^{13, 14}_2
c    -b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_1
c    -b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨  b^{13, 14}_0
c  in DIMACS:
-12032 -12033  12034 -169  12035 0
-12032 -12033  12034 -169 -12036 0
-12032 -12033  12034 -169  12037 0

c  -1+1 --> 0
c    ( b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0 ∧  p_169) -> (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧ -b^{13, 14}_0)
c  in CNF:
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_2
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_1
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_0
c  in DIMACS:
-12032  12033 -12034 -169 -12035 0
-12032  12033 -12034 -169 -12036 0
-12032  12033 -12034 -169 -12037 0

c  0+1 --> 1
c    (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧  p_169) -> (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0)
c  in CNF:
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_2
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_1
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨  b^{13, 14}_0
c  in DIMACS:
 12032  12033  12034 -169 -12035 0
 12032  12033  12034 -169 -12036 0
 12032  12033  12034 -169  12037 0

c  1+1 --> 2
c    (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0 ∧  p_169) -> (-b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0)
c  in CNF:
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_2
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨  b^{13, 14}_1
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ -p_169 ∨ -b^{13, 14}_0
c  in DIMACS:
 12032  12033 -12034 -169 -12035 0
 12032  12033 -12034 -169  12036 0
 12032  12033 -12034 -169 -12037 0

c  2+1 --> break 
c    (-b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧  p_169) -> break
c  in CNF:
c     b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ -p_169 ∨ break
c  in DIMACS:
 12032 -12033  12034 -169 1162 0


c  2-1 --> 1
c    (-b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧ -p_169) -> (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0)
c  in CNF:
c     b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_2
c     b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_1
c     b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨  b^{13, 14}_0
c  in DIMACS:
 12032 -12033  12034  169 -12035 0
 12032 -12033  12034  169 -12036 0
 12032 -12033  12034  169  12037 0

c  1-1 --> 0
c    (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0 ∧ -p_169) -> (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧ -b^{13, 14}_0)
c  in CNF:
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_2
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_1
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_0
c  in DIMACS:
 12032  12033 -12034  169 -12035 0
 12032  12033 -12034  169 -12036 0
 12032  12033 -12034  169 -12037 0

c  0-1 --> -1
c    (-b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧ -p_169) -> ( b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0)
c  in CNF:
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨  b^{13, 14}_2
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_1
c     b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨  b^{13, 14}_0
c  in DIMACS:
 12032  12033  12034  169  12035 0
 12032  12033  12034  169 -12036 0
 12032  12033  12034  169  12037 0

c  -1-1 --> -2
c    ( b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧  b^{13, 13}_0 ∧ -p_169) -> ( b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0)
c  in CNF:
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨  b^{13, 14}_2
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨  b^{13, 14}_1
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨  p_169 ∨ -b^{13, 14}_0
c  in DIMACS:
-12032  12033 -12034  169  12035 0
-12032  12033 -12034  169  12036 0
-12032  12033 -12034  169 -12037 0

c  -2-1 --> break 
c    ( b^{13, 13}_2 ∧  b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧ -p_169) -> break
c  in CNF:
c    -b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨  b^{13, 13}_0 ∨  p_169 ∨ break
c  in DIMACS:
-12032 -12033  12034  169 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 13}_2 ∧ -b^{13, 13}_1 ∧ -b^{13, 13}_0 ∧ true) 
c  in CNF:
c    -b^{13, 13}_2 ∨  b^{13, 13}_1 ∨  b^{13, 13}_0 ∨ false 
c  in DIMACS:
-12032  12033  12034  0

c  3 does not represent an automaton state.
c    -(-b^{13, 13}_2 ∧  b^{13, 13}_1 ∧  b^{13, 13}_0 ∧ true) 
c  in CNF:
c     b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ false 
c  in DIMACS:
 12032 -12033 -12034  0
c  -3 does not represent an automaton state.
c    -( b^{13, 13}_2 ∧  b^{13, 13}_1 ∧  b^{13, 13}_0 ∧ true) 
c  in CNF:
c    -b^{13, 13}_2 ∨ -b^{13, 13}_1 ∨ -b^{13, 13}_0 ∨ false 
c  in DIMACS:
-12032 -12033 -12034  0

c i = 14
c  -2+1 --> -1
c    ( b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧  p_182) -> ( b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0)
c  in CNF:
c    -b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨  b^{13, 15}_2
c    -b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_1
c    -b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨  b^{13, 15}_0
c  in DIMACS:
-12035 -12036  12037 -182  12038 0
-12035 -12036  12037 -182 -12039 0
-12035 -12036  12037 -182  12040 0

c  -1+1 --> 0
c    ( b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0 ∧  p_182) -> (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧ -b^{13, 15}_0)
c  in CNF:
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_2
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_1
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_0
c  in DIMACS:
-12035  12036 -12037 -182 -12038 0
-12035  12036 -12037 -182 -12039 0
-12035  12036 -12037 -182 -12040 0

c  0+1 --> 1
c    (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧  p_182) -> (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0)
c  in CNF:
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_2
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_1
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨  b^{13, 15}_0
c  in DIMACS:
 12035  12036  12037 -182 -12038 0
 12035  12036  12037 -182 -12039 0
 12035  12036  12037 -182  12040 0

c  1+1 --> 2
c    (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0 ∧  p_182) -> (-b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0)
c  in CNF:
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_2
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨  b^{13, 15}_1
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ -p_182 ∨ -b^{13, 15}_0
c  in DIMACS:
 12035  12036 -12037 -182 -12038 0
 12035  12036 -12037 -182  12039 0
 12035  12036 -12037 -182 -12040 0

c  2+1 --> break 
c    (-b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧  p_182) -> break
c  in CNF:
c     b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 12035 -12036  12037 -182 1162 0


c  2-1 --> 1
c    (-b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧ -p_182) -> (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0)
c  in CNF:
c     b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_2
c     b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_1
c     b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨  b^{13, 15}_0
c  in DIMACS:
 12035 -12036  12037  182 -12038 0
 12035 -12036  12037  182 -12039 0
 12035 -12036  12037  182  12040 0

c  1-1 --> 0
c    (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0 ∧ -p_182) -> (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧ -b^{13, 15}_0)
c  in CNF:
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_2
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_1
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_0
c  in DIMACS:
 12035  12036 -12037  182 -12038 0
 12035  12036 -12037  182 -12039 0
 12035  12036 -12037  182 -12040 0

c  0-1 --> -1
c    (-b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧ -p_182) -> ( b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0)
c  in CNF:
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨  b^{13, 15}_2
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_1
c     b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨  b^{13, 15}_0
c  in DIMACS:
 12035  12036  12037  182  12038 0
 12035  12036  12037  182 -12039 0
 12035  12036  12037  182  12040 0

c  -1-1 --> -2
c    ( b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧  b^{13, 14}_0 ∧ -p_182) -> ( b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0)
c  in CNF:
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨  b^{13, 15}_2
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨  b^{13, 15}_1
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨  p_182 ∨ -b^{13, 15}_0
c  in DIMACS:
-12035  12036 -12037  182  12038 0
-12035  12036 -12037  182  12039 0
-12035  12036 -12037  182 -12040 0

c  -2-1 --> break 
c    ( b^{13, 14}_2 ∧  b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨  b^{13, 14}_0 ∨  p_182 ∨ break
c  in DIMACS:
-12035 -12036  12037  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 14}_2 ∧ -b^{13, 14}_1 ∧ -b^{13, 14}_0 ∧ true) 
c  in CNF:
c    -b^{13, 14}_2 ∨  b^{13, 14}_1 ∨  b^{13, 14}_0 ∨ false 
c  in DIMACS:
-12035  12036  12037  0

c  3 does not represent an automaton state.
c    -(-b^{13, 14}_2 ∧  b^{13, 14}_1 ∧  b^{13, 14}_0 ∧ true) 
c  in CNF:
c     b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ false 
c  in DIMACS:
 12035 -12036 -12037  0
c  -3 does not represent an automaton state.
c    -( b^{13, 14}_2 ∧  b^{13, 14}_1 ∧  b^{13, 14}_0 ∧ true) 
c  in CNF:
c    -b^{13, 14}_2 ∨ -b^{13, 14}_1 ∨ -b^{13, 14}_0 ∨ false 
c  in DIMACS:
-12035 -12036 -12037  0

c i = 15
c  -2+1 --> -1
c    ( b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧  p_195) -> ( b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0)
c  in CNF:
c    -b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨  b^{13, 16}_2
c    -b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_1
c    -b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨  b^{13, 16}_0
c  in DIMACS:
-12038 -12039  12040 -195  12041 0
-12038 -12039  12040 -195 -12042 0
-12038 -12039  12040 -195  12043 0

c  -1+1 --> 0
c    ( b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0 ∧  p_195) -> (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧ -b^{13, 16}_0)
c  in CNF:
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_2
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_1
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_0
c  in DIMACS:
-12038  12039 -12040 -195 -12041 0
-12038  12039 -12040 -195 -12042 0
-12038  12039 -12040 -195 -12043 0

c  0+1 --> 1
c    (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧  p_195) -> (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0)
c  in CNF:
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_2
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_1
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨  b^{13, 16}_0
c  in DIMACS:
 12038  12039  12040 -195 -12041 0
 12038  12039  12040 -195 -12042 0
 12038  12039  12040 -195  12043 0

c  1+1 --> 2
c    (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0 ∧  p_195) -> (-b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0)
c  in CNF:
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_2
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨  b^{13, 16}_1
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ -p_195 ∨ -b^{13, 16}_0
c  in DIMACS:
 12038  12039 -12040 -195 -12041 0
 12038  12039 -12040 -195  12042 0
 12038  12039 -12040 -195 -12043 0

c  2+1 --> break 
c    (-b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧  p_195) -> break
c  in CNF:
c     b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 12038 -12039  12040 -195 1162 0


c  2-1 --> 1
c    (-b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧ -p_195) -> (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0)
c  in CNF:
c     b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_2
c     b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_1
c     b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨  b^{13, 16}_0
c  in DIMACS:
 12038 -12039  12040  195 -12041 0
 12038 -12039  12040  195 -12042 0
 12038 -12039  12040  195  12043 0

c  1-1 --> 0
c    (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0 ∧ -p_195) -> (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧ -b^{13, 16}_0)
c  in CNF:
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_2
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_1
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_0
c  in DIMACS:
 12038  12039 -12040  195 -12041 0
 12038  12039 -12040  195 -12042 0
 12038  12039 -12040  195 -12043 0

c  0-1 --> -1
c    (-b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧ -p_195) -> ( b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0)
c  in CNF:
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨  b^{13, 16}_2
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_1
c     b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨  b^{13, 16}_0
c  in DIMACS:
 12038  12039  12040  195  12041 0
 12038  12039  12040  195 -12042 0
 12038  12039  12040  195  12043 0

c  -1-1 --> -2
c    ( b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧  b^{13, 15}_0 ∧ -p_195) -> ( b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0)
c  in CNF:
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨  b^{13, 16}_2
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨  b^{13, 16}_1
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨  p_195 ∨ -b^{13, 16}_0
c  in DIMACS:
-12038  12039 -12040  195  12041 0
-12038  12039 -12040  195  12042 0
-12038  12039 -12040  195 -12043 0

c  -2-1 --> break 
c    ( b^{13, 15}_2 ∧  b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨  b^{13, 15}_0 ∨  p_195 ∨ break
c  in DIMACS:
-12038 -12039  12040  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 15}_2 ∧ -b^{13, 15}_1 ∧ -b^{13, 15}_0 ∧ true) 
c  in CNF:
c    -b^{13, 15}_2 ∨  b^{13, 15}_1 ∨  b^{13, 15}_0 ∨ false 
c  in DIMACS:
-12038  12039  12040  0

c  3 does not represent an automaton state.
c    -(-b^{13, 15}_2 ∧  b^{13, 15}_1 ∧  b^{13, 15}_0 ∧ true) 
c  in CNF:
c     b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ false 
c  in DIMACS:
 12038 -12039 -12040  0
c  -3 does not represent an automaton state.
c    -( b^{13, 15}_2 ∧  b^{13, 15}_1 ∧  b^{13, 15}_0 ∧ true) 
c  in CNF:
c    -b^{13, 15}_2 ∨ -b^{13, 15}_1 ∨ -b^{13, 15}_0 ∨ false 
c  in DIMACS:
-12038 -12039 -12040  0

c i = 16
c  -2+1 --> -1
c    ( b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧  p_208) -> ( b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0)
c  in CNF:
c    -b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨  b^{13, 17}_2
c    -b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_1
c    -b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨  b^{13, 17}_0
c  in DIMACS:
-12041 -12042  12043 -208  12044 0
-12041 -12042  12043 -208 -12045 0
-12041 -12042  12043 -208  12046 0

c  -1+1 --> 0
c    ( b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0 ∧  p_208) -> (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧ -b^{13, 17}_0)
c  in CNF:
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_2
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_1
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_0
c  in DIMACS:
-12041  12042 -12043 -208 -12044 0
-12041  12042 -12043 -208 -12045 0
-12041  12042 -12043 -208 -12046 0

c  0+1 --> 1
c    (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧  p_208) -> (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0)
c  in CNF:
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_2
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_1
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨  b^{13, 17}_0
c  in DIMACS:
 12041  12042  12043 -208 -12044 0
 12041  12042  12043 -208 -12045 0
 12041  12042  12043 -208  12046 0

c  1+1 --> 2
c    (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0 ∧  p_208) -> (-b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0)
c  in CNF:
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_2
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨  b^{13, 17}_1
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ -p_208 ∨ -b^{13, 17}_0
c  in DIMACS:
 12041  12042 -12043 -208 -12044 0
 12041  12042 -12043 -208  12045 0
 12041  12042 -12043 -208 -12046 0

c  2+1 --> break 
c    (-b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧  p_208) -> break
c  in CNF:
c     b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 12041 -12042  12043 -208 1162 0


c  2-1 --> 1
c    (-b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧ -p_208) -> (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0)
c  in CNF:
c     b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_2
c     b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_1
c     b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨  b^{13, 17}_0
c  in DIMACS:
 12041 -12042  12043  208 -12044 0
 12041 -12042  12043  208 -12045 0
 12041 -12042  12043  208  12046 0

c  1-1 --> 0
c    (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0 ∧ -p_208) -> (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧ -b^{13, 17}_0)
c  in CNF:
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_2
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_1
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_0
c  in DIMACS:
 12041  12042 -12043  208 -12044 0
 12041  12042 -12043  208 -12045 0
 12041  12042 -12043  208 -12046 0

c  0-1 --> -1
c    (-b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧ -p_208) -> ( b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0)
c  in CNF:
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨  b^{13, 17}_2
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_1
c     b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨  b^{13, 17}_0
c  in DIMACS:
 12041  12042  12043  208  12044 0
 12041  12042  12043  208 -12045 0
 12041  12042  12043  208  12046 0

c  -1-1 --> -2
c    ( b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧  b^{13, 16}_0 ∧ -p_208) -> ( b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0)
c  in CNF:
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨  b^{13, 17}_2
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨  b^{13, 17}_1
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨  p_208 ∨ -b^{13, 17}_0
c  in DIMACS:
-12041  12042 -12043  208  12044 0
-12041  12042 -12043  208  12045 0
-12041  12042 -12043  208 -12046 0

c  -2-1 --> break 
c    ( b^{13, 16}_2 ∧  b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨  b^{13, 16}_0 ∨  p_208 ∨ break
c  in DIMACS:
-12041 -12042  12043  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 16}_2 ∧ -b^{13, 16}_1 ∧ -b^{13, 16}_0 ∧ true) 
c  in CNF:
c    -b^{13, 16}_2 ∨  b^{13, 16}_1 ∨  b^{13, 16}_0 ∨ false 
c  in DIMACS:
-12041  12042  12043  0

c  3 does not represent an automaton state.
c    -(-b^{13, 16}_2 ∧  b^{13, 16}_1 ∧  b^{13, 16}_0 ∧ true) 
c  in CNF:
c     b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ false 
c  in DIMACS:
 12041 -12042 -12043  0
c  -3 does not represent an automaton state.
c    -( b^{13, 16}_2 ∧  b^{13, 16}_1 ∧  b^{13, 16}_0 ∧ true) 
c  in CNF:
c    -b^{13, 16}_2 ∨ -b^{13, 16}_1 ∨ -b^{13, 16}_0 ∨ false 
c  in DIMACS:
-12041 -12042 -12043  0

c i = 17
c  -2+1 --> -1
c    ( b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧  p_221) -> ( b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0)
c  in CNF:
c    -b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨  b^{13, 18}_2
c    -b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_1
c    -b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨  b^{13, 18}_0
c  in DIMACS:
-12044 -12045  12046 -221  12047 0
-12044 -12045  12046 -221 -12048 0
-12044 -12045  12046 -221  12049 0

c  -1+1 --> 0
c    ( b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0 ∧  p_221) -> (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧ -b^{13, 18}_0)
c  in CNF:
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_2
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_1
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_0
c  in DIMACS:
-12044  12045 -12046 -221 -12047 0
-12044  12045 -12046 -221 -12048 0
-12044  12045 -12046 -221 -12049 0

c  0+1 --> 1
c    (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧  p_221) -> (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0)
c  in CNF:
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_2
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_1
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨  b^{13, 18}_0
c  in DIMACS:
 12044  12045  12046 -221 -12047 0
 12044  12045  12046 -221 -12048 0
 12044  12045  12046 -221  12049 0

c  1+1 --> 2
c    (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0 ∧  p_221) -> (-b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0)
c  in CNF:
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_2
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨  b^{13, 18}_1
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ -p_221 ∨ -b^{13, 18}_0
c  in DIMACS:
 12044  12045 -12046 -221 -12047 0
 12044  12045 -12046 -221  12048 0
 12044  12045 -12046 -221 -12049 0

c  2+1 --> break 
c    (-b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧  p_221) -> break
c  in CNF:
c     b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ -p_221 ∨ break
c  in DIMACS:
 12044 -12045  12046 -221 1162 0


c  2-1 --> 1
c    (-b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧ -p_221) -> (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0)
c  in CNF:
c     b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_2
c     b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_1
c     b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨  b^{13, 18}_0
c  in DIMACS:
 12044 -12045  12046  221 -12047 0
 12044 -12045  12046  221 -12048 0
 12044 -12045  12046  221  12049 0

c  1-1 --> 0
c    (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0 ∧ -p_221) -> (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧ -b^{13, 18}_0)
c  in CNF:
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_2
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_1
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_0
c  in DIMACS:
 12044  12045 -12046  221 -12047 0
 12044  12045 -12046  221 -12048 0
 12044  12045 -12046  221 -12049 0

c  0-1 --> -1
c    (-b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧ -p_221) -> ( b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0)
c  in CNF:
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨  b^{13, 18}_2
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_1
c     b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨  b^{13, 18}_0
c  in DIMACS:
 12044  12045  12046  221  12047 0
 12044  12045  12046  221 -12048 0
 12044  12045  12046  221  12049 0

c  -1-1 --> -2
c    ( b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧  b^{13, 17}_0 ∧ -p_221) -> ( b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0)
c  in CNF:
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨  b^{13, 18}_2
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨  b^{13, 18}_1
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨  p_221 ∨ -b^{13, 18}_0
c  in DIMACS:
-12044  12045 -12046  221  12047 0
-12044  12045 -12046  221  12048 0
-12044  12045 -12046  221 -12049 0

c  -2-1 --> break 
c    ( b^{13, 17}_2 ∧  b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧ -p_221) -> break
c  in CNF:
c    -b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨  b^{13, 17}_0 ∨  p_221 ∨ break
c  in DIMACS:
-12044 -12045  12046  221 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 17}_2 ∧ -b^{13, 17}_1 ∧ -b^{13, 17}_0 ∧ true) 
c  in CNF:
c    -b^{13, 17}_2 ∨  b^{13, 17}_1 ∨  b^{13, 17}_0 ∨ false 
c  in DIMACS:
-12044  12045  12046  0

c  3 does not represent an automaton state.
c    -(-b^{13, 17}_2 ∧  b^{13, 17}_1 ∧  b^{13, 17}_0 ∧ true) 
c  in CNF:
c     b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ false 
c  in DIMACS:
 12044 -12045 -12046  0
c  -3 does not represent an automaton state.
c    -( b^{13, 17}_2 ∧  b^{13, 17}_1 ∧  b^{13, 17}_0 ∧ true) 
c  in CNF:
c    -b^{13, 17}_2 ∨ -b^{13, 17}_1 ∨ -b^{13, 17}_0 ∨ false 
c  in DIMACS:
-12044 -12045 -12046  0

c i = 18
c  -2+1 --> -1
c    ( b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧  p_234) -> ( b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0)
c  in CNF:
c    -b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨  b^{13, 19}_2
c    -b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_1
c    -b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨  b^{13, 19}_0
c  in DIMACS:
-12047 -12048  12049 -234  12050 0
-12047 -12048  12049 -234 -12051 0
-12047 -12048  12049 -234  12052 0

c  -1+1 --> 0
c    ( b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0 ∧  p_234) -> (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧ -b^{13, 19}_0)
c  in CNF:
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_2
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_1
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_0
c  in DIMACS:
-12047  12048 -12049 -234 -12050 0
-12047  12048 -12049 -234 -12051 0
-12047  12048 -12049 -234 -12052 0

c  0+1 --> 1
c    (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧  p_234) -> (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0)
c  in CNF:
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_2
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_1
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨  b^{13, 19}_0
c  in DIMACS:
 12047  12048  12049 -234 -12050 0
 12047  12048  12049 -234 -12051 0
 12047  12048  12049 -234  12052 0

c  1+1 --> 2
c    (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0 ∧  p_234) -> (-b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0)
c  in CNF:
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_2
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨  b^{13, 19}_1
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ -p_234 ∨ -b^{13, 19}_0
c  in DIMACS:
 12047  12048 -12049 -234 -12050 0
 12047  12048 -12049 -234  12051 0
 12047  12048 -12049 -234 -12052 0

c  2+1 --> break 
c    (-b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧  p_234) -> break
c  in CNF:
c     b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 12047 -12048  12049 -234 1162 0


c  2-1 --> 1
c    (-b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧ -p_234) -> (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0)
c  in CNF:
c     b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_2
c     b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_1
c     b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨  b^{13, 19}_0
c  in DIMACS:
 12047 -12048  12049  234 -12050 0
 12047 -12048  12049  234 -12051 0
 12047 -12048  12049  234  12052 0

c  1-1 --> 0
c    (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0 ∧ -p_234) -> (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧ -b^{13, 19}_0)
c  in CNF:
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_2
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_1
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_0
c  in DIMACS:
 12047  12048 -12049  234 -12050 0
 12047  12048 -12049  234 -12051 0
 12047  12048 -12049  234 -12052 0

c  0-1 --> -1
c    (-b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧ -p_234) -> ( b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0)
c  in CNF:
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨  b^{13, 19}_2
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_1
c     b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨  b^{13, 19}_0
c  in DIMACS:
 12047  12048  12049  234  12050 0
 12047  12048  12049  234 -12051 0
 12047  12048  12049  234  12052 0

c  -1-1 --> -2
c    ( b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧  b^{13, 18}_0 ∧ -p_234) -> ( b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0)
c  in CNF:
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨  b^{13, 19}_2
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨  b^{13, 19}_1
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨  p_234 ∨ -b^{13, 19}_0
c  in DIMACS:
-12047  12048 -12049  234  12050 0
-12047  12048 -12049  234  12051 0
-12047  12048 -12049  234 -12052 0

c  -2-1 --> break 
c    ( b^{13, 18}_2 ∧  b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨  b^{13, 18}_0 ∨  p_234 ∨ break
c  in DIMACS:
-12047 -12048  12049  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 18}_2 ∧ -b^{13, 18}_1 ∧ -b^{13, 18}_0 ∧ true) 
c  in CNF:
c    -b^{13, 18}_2 ∨  b^{13, 18}_1 ∨  b^{13, 18}_0 ∨ false 
c  in DIMACS:
-12047  12048  12049  0

c  3 does not represent an automaton state.
c    -(-b^{13, 18}_2 ∧  b^{13, 18}_1 ∧  b^{13, 18}_0 ∧ true) 
c  in CNF:
c     b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ false 
c  in DIMACS:
 12047 -12048 -12049  0
c  -3 does not represent an automaton state.
c    -( b^{13, 18}_2 ∧  b^{13, 18}_1 ∧  b^{13, 18}_0 ∧ true) 
c  in CNF:
c    -b^{13, 18}_2 ∨ -b^{13, 18}_1 ∨ -b^{13, 18}_0 ∨ false 
c  in DIMACS:
-12047 -12048 -12049  0

c i = 19
c  -2+1 --> -1
c    ( b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧  p_247) -> ( b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0)
c  in CNF:
c    -b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨  b^{13, 20}_2
c    -b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_1
c    -b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨  b^{13, 20}_0
c  in DIMACS:
-12050 -12051  12052 -247  12053 0
-12050 -12051  12052 -247 -12054 0
-12050 -12051  12052 -247  12055 0

c  -1+1 --> 0
c    ( b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0 ∧  p_247) -> (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧ -b^{13, 20}_0)
c  in CNF:
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_2
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_1
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_0
c  in DIMACS:
-12050  12051 -12052 -247 -12053 0
-12050  12051 -12052 -247 -12054 0
-12050  12051 -12052 -247 -12055 0

c  0+1 --> 1
c    (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧  p_247) -> (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0)
c  in CNF:
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_2
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_1
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨  b^{13, 20}_0
c  in DIMACS:
 12050  12051  12052 -247 -12053 0
 12050  12051  12052 -247 -12054 0
 12050  12051  12052 -247  12055 0

c  1+1 --> 2
c    (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0 ∧  p_247) -> (-b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0)
c  in CNF:
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_2
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨  b^{13, 20}_1
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ -p_247 ∨ -b^{13, 20}_0
c  in DIMACS:
 12050  12051 -12052 -247 -12053 0
 12050  12051 -12052 -247  12054 0
 12050  12051 -12052 -247 -12055 0

c  2+1 --> break 
c    (-b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧  p_247) -> break
c  in CNF:
c     b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ -p_247 ∨ break
c  in DIMACS:
 12050 -12051  12052 -247 1162 0


c  2-1 --> 1
c    (-b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧ -p_247) -> (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0)
c  in CNF:
c     b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_2
c     b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_1
c     b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨  b^{13, 20}_0
c  in DIMACS:
 12050 -12051  12052  247 -12053 0
 12050 -12051  12052  247 -12054 0
 12050 -12051  12052  247  12055 0

c  1-1 --> 0
c    (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0 ∧ -p_247) -> (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧ -b^{13, 20}_0)
c  in CNF:
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_2
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_1
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_0
c  in DIMACS:
 12050  12051 -12052  247 -12053 0
 12050  12051 -12052  247 -12054 0
 12050  12051 -12052  247 -12055 0

c  0-1 --> -1
c    (-b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧ -p_247) -> ( b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0)
c  in CNF:
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨  b^{13, 20}_2
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_1
c     b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨  b^{13, 20}_0
c  in DIMACS:
 12050  12051  12052  247  12053 0
 12050  12051  12052  247 -12054 0
 12050  12051  12052  247  12055 0

c  -1-1 --> -2
c    ( b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧  b^{13, 19}_0 ∧ -p_247) -> ( b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0)
c  in CNF:
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨  b^{13, 20}_2
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨  b^{13, 20}_1
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨  p_247 ∨ -b^{13, 20}_0
c  in DIMACS:
-12050  12051 -12052  247  12053 0
-12050  12051 -12052  247  12054 0
-12050  12051 -12052  247 -12055 0

c  -2-1 --> break 
c    ( b^{13, 19}_2 ∧  b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧ -p_247) -> break
c  in CNF:
c    -b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨  b^{13, 19}_0 ∨  p_247 ∨ break
c  in DIMACS:
-12050 -12051  12052  247 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 19}_2 ∧ -b^{13, 19}_1 ∧ -b^{13, 19}_0 ∧ true) 
c  in CNF:
c    -b^{13, 19}_2 ∨  b^{13, 19}_1 ∨  b^{13, 19}_0 ∨ false 
c  in DIMACS:
-12050  12051  12052  0

c  3 does not represent an automaton state.
c    -(-b^{13, 19}_2 ∧  b^{13, 19}_1 ∧  b^{13, 19}_0 ∧ true) 
c  in CNF:
c     b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ false 
c  in DIMACS:
 12050 -12051 -12052  0
c  -3 does not represent an automaton state.
c    -( b^{13, 19}_2 ∧  b^{13, 19}_1 ∧  b^{13, 19}_0 ∧ true) 
c  in CNF:
c    -b^{13, 19}_2 ∨ -b^{13, 19}_1 ∨ -b^{13, 19}_0 ∨ false 
c  in DIMACS:
-12050 -12051 -12052  0

c i = 20
c  -2+1 --> -1
c    ( b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧  p_260) -> ( b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0)
c  in CNF:
c    -b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨  b^{13, 21}_2
c    -b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_1
c    -b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨  b^{13, 21}_0
c  in DIMACS:
-12053 -12054  12055 -260  12056 0
-12053 -12054  12055 -260 -12057 0
-12053 -12054  12055 -260  12058 0

c  -1+1 --> 0
c    ( b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0 ∧  p_260) -> (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧ -b^{13, 21}_0)
c  in CNF:
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_2
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_1
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_0
c  in DIMACS:
-12053  12054 -12055 -260 -12056 0
-12053  12054 -12055 -260 -12057 0
-12053  12054 -12055 -260 -12058 0

c  0+1 --> 1
c    (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧  p_260) -> (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0)
c  in CNF:
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_2
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_1
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨  b^{13, 21}_0
c  in DIMACS:
 12053  12054  12055 -260 -12056 0
 12053  12054  12055 -260 -12057 0
 12053  12054  12055 -260  12058 0

c  1+1 --> 2
c    (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0 ∧  p_260) -> (-b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0)
c  in CNF:
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_2
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨  b^{13, 21}_1
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ -p_260 ∨ -b^{13, 21}_0
c  in DIMACS:
 12053  12054 -12055 -260 -12056 0
 12053  12054 -12055 -260  12057 0
 12053  12054 -12055 -260 -12058 0

c  2+1 --> break 
c    (-b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧  p_260) -> break
c  in CNF:
c     b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 12053 -12054  12055 -260 1162 0


c  2-1 --> 1
c    (-b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧ -p_260) -> (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0)
c  in CNF:
c     b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_2
c     b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_1
c     b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨  b^{13, 21}_0
c  in DIMACS:
 12053 -12054  12055  260 -12056 0
 12053 -12054  12055  260 -12057 0
 12053 -12054  12055  260  12058 0

c  1-1 --> 0
c    (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0 ∧ -p_260) -> (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧ -b^{13, 21}_0)
c  in CNF:
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_2
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_1
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_0
c  in DIMACS:
 12053  12054 -12055  260 -12056 0
 12053  12054 -12055  260 -12057 0
 12053  12054 -12055  260 -12058 0

c  0-1 --> -1
c    (-b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧ -p_260) -> ( b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0)
c  in CNF:
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨  b^{13, 21}_2
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_1
c     b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨  b^{13, 21}_0
c  in DIMACS:
 12053  12054  12055  260  12056 0
 12053  12054  12055  260 -12057 0
 12053  12054  12055  260  12058 0

c  -1-1 --> -2
c    ( b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧  b^{13, 20}_0 ∧ -p_260) -> ( b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0)
c  in CNF:
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨  b^{13, 21}_2
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨  b^{13, 21}_1
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨  p_260 ∨ -b^{13, 21}_0
c  in DIMACS:
-12053  12054 -12055  260  12056 0
-12053  12054 -12055  260  12057 0
-12053  12054 -12055  260 -12058 0

c  -2-1 --> break 
c    ( b^{13, 20}_2 ∧  b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨  b^{13, 20}_0 ∨  p_260 ∨ break
c  in DIMACS:
-12053 -12054  12055  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 20}_2 ∧ -b^{13, 20}_1 ∧ -b^{13, 20}_0 ∧ true) 
c  in CNF:
c    -b^{13, 20}_2 ∨  b^{13, 20}_1 ∨  b^{13, 20}_0 ∨ false 
c  in DIMACS:
-12053  12054  12055  0

c  3 does not represent an automaton state.
c    -(-b^{13, 20}_2 ∧  b^{13, 20}_1 ∧  b^{13, 20}_0 ∧ true) 
c  in CNF:
c     b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ false 
c  in DIMACS:
 12053 -12054 -12055  0
c  -3 does not represent an automaton state.
c    -( b^{13, 20}_2 ∧  b^{13, 20}_1 ∧  b^{13, 20}_0 ∧ true) 
c  in CNF:
c    -b^{13, 20}_2 ∨ -b^{13, 20}_1 ∨ -b^{13, 20}_0 ∨ false 
c  in DIMACS:
-12053 -12054 -12055  0

c i = 21
c  -2+1 --> -1
c    ( b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧  p_273) -> ( b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0)
c  in CNF:
c    -b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨  b^{13, 22}_2
c    -b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_1
c    -b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨  b^{13, 22}_0
c  in DIMACS:
-12056 -12057  12058 -273  12059 0
-12056 -12057  12058 -273 -12060 0
-12056 -12057  12058 -273  12061 0

c  -1+1 --> 0
c    ( b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0 ∧  p_273) -> (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧ -b^{13, 22}_0)
c  in CNF:
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_2
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_1
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_0
c  in DIMACS:
-12056  12057 -12058 -273 -12059 0
-12056  12057 -12058 -273 -12060 0
-12056  12057 -12058 -273 -12061 0

c  0+1 --> 1
c    (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧  p_273) -> (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0)
c  in CNF:
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_2
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_1
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨  b^{13, 22}_0
c  in DIMACS:
 12056  12057  12058 -273 -12059 0
 12056  12057  12058 -273 -12060 0
 12056  12057  12058 -273  12061 0

c  1+1 --> 2
c    (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0 ∧  p_273) -> (-b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0)
c  in CNF:
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_2
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨  b^{13, 22}_1
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ -p_273 ∨ -b^{13, 22}_0
c  in DIMACS:
 12056  12057 -12058 -273 -12059 0
 12056  12057 -12058 -273  12060 0
 12056  12057 -12058 -273 -12061 0

c  2+1 --> break 
c    (-b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧  p_273) -> break
c  in CNF:
c     b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 12056 -12057  12058 -273 1162 0


c  2-1 --> 1
c    (-b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧ -p_273) -> (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0)
c  in CNF:
c     b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_2
c     b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_1
c     b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨  b^{13, 22}_0
c  in DIMACS:
 12056 -12057  12058  273 -12059 0
 12056 -12057  12058  273 -12060 0
 12056 -12057  12058  273  12061 0

c  1-1 --> 0
c    (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0 ∧ -p_273) -> (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧ -b^{13, 22}_0)
c  in CNF:
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_2
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_1
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_0
c  in DIMACS:
 12056  12057 -12058  273 -12059 0
 12056  12057 -12058  273 -12060 0
 12056  12057 -12058  273 -12061 0

c  0-1 --> -1
c    (-b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧ -p_273) -> ( b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0)
c  in CNF:
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨  b^{13, 22}_2
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_1
c     b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨  b^{13, 22}_0
c  in DIMACS:
 12056  12057  12058  273  12059 0
 12056  12057  12058  273 -12060 0
 12056  12057  12058  273  12061 0

c  -1-1 --> -2
c    ( b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧  b^{13, 21}_0 ∧ -p_273) -> ( b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0)
c  in CNF:
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨  b^{13, 22}_2
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨  b^{13, 22}_1
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨  p_273 ∨ -b^{13, 22}_0
c  in DIMACS:
-12056  12057 -12058  273  12059 0
-12056  12057 -12058  273  12060 0
-12056  12057 -12058  273 -12061 0

c  -2-1 --> break 
c    ( b^{13, 21}_2 ∧  b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨  b^{13, 21}_0 ∨  p_273 ∨ break
c  in DIMACS:
-12056 -12057  12058  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 21}_2 ∧ -b^{13, 21}_1 ∧ -b^{13, 21}_0 ∧ true) 
c  in CNF:
c    -b^{13, 21}_2 ∨  b^{13, 21}_1 ∨  b^{13, 21}_0 ∨ false 
c  in DIMACS:
-12056  12057  12058  0

c  3 does not represent an automaton state.
c    -(-b^{13, 21}_2 ∧  b^{13, 21}_1 ∧  b^{13, 21}_0 ∧ true) 
c  in CNF:
c     b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ false 
c  in DIMACS:
 12056 -12057 -12058  0
c  -3 does not represent an automaton state.
c    -( b^{13, 21}_2 ∧  b^{13, 21}_1 ∧  b^{13, 21}_0 ∧ true) 
c  in CNF:
c    -b^{13, 21}_2 ∨ -b^{13, 21}_1 ∨ -b^{13, 21}_0 ∨ false 
c  in DIMACS:
-12056 -12057 -12058  0

c i = 22
c  -2+1 --> -1
c    ( b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧  p_286) -> ( b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0)
c  in CNF:
c    -b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨  b^{13, 23}_2
c    -b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_1
c    -b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨  b^{13, 23}_0
c  in DIMACS:
-12059 -12060  12061 -286  12062 0
-12059 -12060  12061 -286 -12063 0
-12059 -12060  12061 -286  12064 0

c  -1+1 --> 0
c    ( b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0 ∧  p_286) -> (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧ -b^{13, 23}_0)
c  in CNF:
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_2
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_1
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_0
c  in DIMACS:
-12059  12060 -12061 -286 -12062 0
-12059  12060 -12061 -286 -12063 0
-12059  12060 -12061 -286 -12064 0

c  0+1 --> 1
c    (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧  p_286) -> (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0)
c  in CNF:
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_2
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_1
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨  b^{13, 23}_0
c  in DIMACS:
 12059  12060  12061 -286 -12062 0
 12059  12060  12061 -286 -12063 0
 12059  12060  12061 -286  12064 0

c  1+1 --> 2
c    (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0 ∧  p_286) -> (-b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0)
c  in CNF:
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_2
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨  b^{13, 23}_1
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ -p_286 ∨ -b^{13, 23}_0
c  in DIMACS:
 12059  12060 -12061 -286 -12062 0
 12059  12060 -12061 -286  12063 0
 12059  12060 -12061 -286 -12064 0

c  2+1 --> break 
c    (-b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧  p_286) -> break
c  in CNF:
c     b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 12059 -12060  12061 -286 1162 0


c  2-1 --> 1
c    (-b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧ -p_286) -> (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0)
c  in CNF:
c     b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_2
c     b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_1
c     b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨  b^{13, 23}_0
c  in DIMACS:
 12059 -12060  12061  286 -12062 0
 12059 -12060  12061  286 -12063 0
 12059 -12060  12061  286  12064 0

c  1-1 --> 0
c    (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0 ∧ -p_286) -> (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧ -b^{13, 23}_0)
c  in CNF:
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_2
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_1
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_0
c  in DIMACS:
 12059  12060 -12061  286 -12062 0
 12059  12060 -12061  286 -12063 0
 12059  12060 -12061  286 -12064 0

c  0-1 --> -1
c    (-b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧ -p_286) -> ( b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0)
c  in CNF:
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨  b^{13, 23}_2
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_1
c     b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨  b^{13, 23}_0
c  in DIMACS:
 12059  12060  12061  286  12062 0
 12059  12060  12061  286 -12063 0
 12059  12060  12061  286  12064 0

c  -1-1 --> -2
c    ( b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧  b^{13, 22}_0 ∧ -p_286) -> ( b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0)
c  in CNF:
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨  b^{13, 23}_2
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨  b^{13, 23}_1
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨  p_286 ∨ -b^{13, 23}_0
c  in DIMACS:
-12059  12060 -12061  286  12062 0
-12059  12060 -12061  286  12063 0
-12059  12060 -12061  286 -12064 0

c  -2-1 --> break 
c    ( b^{13, 22}_2 ∧  b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨  b^{13, 22}_0 ∨  p_286 ∨ break
c  in DIMACS:
-12059 -12060  12061  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 22}_2 ∧ -b^{13, 22}_1 ∧ -b^{13, 22}_0 ∧ true) 
c  in CNF:
c    -b^{13, 22}_2 ∨  b^{13, 22}_1 ∨  b^{13, 22}_0 ∨ false 
c  in DIMACS:
-12059  12060  12061  0

c  3 does not represent an automaton state.
c    -(-b^{13, 22}_2 ∧  b^{13, 22}_1 ∧  b^{13, 22}_0 ∧ true) 
c  in CNF:
c     b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ false 
c  in DIMACS:
 12059 -12060 -12061  0
c  -3 does not represent an automaton state.
c    -( b^{13, 22}_2 ∧  b^{13, 22}_1 ∧  b^{13, 22}_0 ∧ true) 
c  in CNF:
c    -b^{13, 22}_2 ∨ -b^{13, 22}_1 ∨ -b^{13, 22}_0 ∨ false 
c  in DIMACS:
-12059 -12060 -12061  0

c i = 23
c  -2+1 --> -1
c    ( b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧  p_299) -> ( b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0)
c  in CNF:
c    -b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨  b^{13, 24}_2
c    -b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_1
c    -b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨  b^{13, 24}_0
c  in DIMACS:
-12062 -12063  12064 -299  12065 0
-12062 -12063  12064 -299 -12066 0
-12062 -12063  12064 -299  12067 0

c  -1+1 --> 0
c    ( b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0 ∧  p_299) -> (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧ -b^{13, 24}_0)
c  in CNF:
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_2
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_1
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_0
c  in DIMACS:
-12062  12063 -12064 -299 -12065 0
-12062  12063 -12064 -299 -12066 0
-12062  12063 -12064 -299 -12067 0

c  0+1 --> 1
c    (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧  p_299) -> (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0)
c  in CNF:
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_2
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_1
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨  b^{13, 24}_0
c  in DIMACS:
 12062  12063  12064 -299 -12065 0
 12062  12063  12064 -299 -12066 0
 12062  12063  12064 -299  12067 0

c  1+1 --> 2
c    (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0 ∧  p_299) -> (-b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0)
c  in CNF:
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_2
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨  b^{13, 24}_1
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ -p_299 ∨ -b^{13, 24}_0
c  in DIMACS:
 12062  12063 -12064 -299 -12065 0
 12062  12063 -12064 -299  12066 0
 12062  12063 -12064 -299 -12067 0

c  2+1 --> break 
c    (-b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧  p_299) -> break
c  in CNF:
c     b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ -p_299 ∨ break
c  in DIMACS:
 12062 -12063  12064 -299 1162 0


c  2-1 --> 1
c    (-b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧ -p_299) -> (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0)
c  in CNF:
c     b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_2
c     b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_1
c     b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨  b^{13, 24}_0
c  in DIMACS:
 12062 -12063  12064  299 -12065 0
 12062 -12063  12064  299 -12066 0
 12062 -12063  12064  299  12067 0

c  1-1 --> 0
c    (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0 ∧ -p_299) -> (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧ -b^{13, 24}_0)
c  in CNF:
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_2
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_1
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_0
c  in DIMACS:
 12062  12063 -12064  299 -12065 0
 12062  12063 -12064  299 -12066 0
 12062  12063 -12064  299 -12067 0

c  0-1 --> -1
c    (-b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧ -p_299) -> ( b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0)
c  in CNF:
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨  b^{13, 24}_2
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_1
c     b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨  b^{13, 24}_0
c  in DIMACS:
 12062  12063  12064  299  12065 0
 12062  12063  12064  299 -12066 0
 12062  12063  12064  299  12067 0

c  -1-1 --> -2
c    ( b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧  b^{13, 23}_0 ∧ -p_299) -> ( b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0)
c  in CNF:
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨  b^{13, 24}_2
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨  b^{13, 24}_1
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨  p_299 ∨ -b^{13, 24}_0
c  in DIMACS:
-12062  12063 -12064  299  12065 0
-12062  12063 -12064  299  12066 0
-12062  12063 -12064  299 -12067 0

c  -2-1 --> break 
c    ( b^{13, 23}_2 ∧  b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧ -p_299) -> break
c  in CNF:
c    -b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨  b^{13, 23}_0 ∨  p_299 ∨ break
c  in DIMACS:
-12062 -12063  12064  299 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 23}_2 ∧ -b^{13, 23}_1 ∧ -b^{13, 23}_0 ∧ true) 
c  in CNF:
c    -b^{13, 23}_2 ∨  b^{13, 23}_1 ∨  b^{13, 23}_0 ∨ false 
c  in DIMACS:
-12062  12063  12064  0

c  3 does not represent an automaton state.
c    -(-b^{13, 23}_2 ∧  b^{13, 23}_1 ∧  b^{13, 23}_0 ∧ true) 
c  in CNF:
c     b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ false 
c  in DIMACS:
 12062 -12063 -12064  0
c  -3 does not represent an automaton state.
c    -( b^{13, 23}_2 ∧  b^{13, 23}_1 ∧  b^{13, 23}_0 ∧ true) 
c  in CNF:
c    -b^{13, 23}_2 ∨ -b^{13, 23}_1 ∨ -b^{13, 23}_0 ∨ false 
c  in DIMACS:
-12062 -12063 -12064  0

c i = 24
c  -2+1 --> -1
c    ( b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧  p_312) -> ( b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0)
c  in CNF:
c    -b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨  b^{13, 25}_2
c    -b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_1
c    -b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨  b^{13, 25}_0
c  in DIMACS:
-12065 -12066  12067 -312  12068 0
-12065 -12066  12067 -312 -12069 0
-12065 -12066  12067 -312  12070 0

c  -1+1 --> 0
c    ( b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0 ∧  p_312) -> (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧ -b^{13, 25}_0)
c  in CNF:
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_2
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_1
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_0
c  in DIMACS:
-12065  12066 -12067 -312 -12068 0
-12065  12066 -12067 -312 -12069 0
-12065  12066 -12067 -312 -12070 0

c  0+1 --> 1
c    (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧  p_312) -> (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0)
c  in CNF:
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_2
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_1
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨  b^{13, 25}_0
c  in DIMACS:
 12065  12066  12067 -312 -12068 0
 12065  12066  12067 -312 -12069 0
 12065  12066  12067 -312  12070 0

c  1+1 --> 2
c    (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0 ∧  p_312) -> (-b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0)
c  in CNF:
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_2
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨  b^{13, 25}_1
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ -p_312 ∨ -b^{13, 25}_0
c  in DIMACS:
 12065  12066 -12067 -312 -12068 0
 12065  12066 -12067 -312  12069 0
 12065  12066 -12067 -312 -12070 0

c  2+1 --> break 
c    (-b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧  p_312) -> break
c  in CNF:
c     b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 12065 -12066  12067 -312 1162 0


c  2-1 --> 1
c    (-b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧ -p_312) -> (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0)
c  in CNF:
c     b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_2
c     b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_1
c     b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨  b^{13, 25}_0
c  in DIMACS:
 12065 -12066  12067  312 -12068 0
 12065 -12066  12067  312 -12069 0
 12065 -12066  12067  312  12070 0

c  1-1 --> 0
c    (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0 ∧ -p_312) -> (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧ -b^{13, 25}_0)
c  in CNF:
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_2
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_1
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_0
c  in DIMACS:
 12065  12066 -12067  312 -12068 0
 12065  12066 -12067  312 -12069 0
 12065  12066 -12067  312 -12070 0

c  0-1 --> -1
c    (-b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧ -p_312) -> ( b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0)
c  in CNF:
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨  b^{13, 25}_2
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_1
c     b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨  b^{13, 25}_0
c  in DIMACS:
 12065  12066  12067  312  12068 0
 12065  12066  12067  312 -12069 0
 12065  12066  12067  312  12070 0

c  -1-1 --> -2
c    ( b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧  b^{13, 24}_0 ∧ -p_312) -> ( b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0)
c  in CNF:
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨  b^{13, 25}_2
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨  b^{13, 25}_1
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨  p_312 ∨ -b^{13, 25}_0
c  in DIMACS:
-12065  12066 -12067  312  12068 0
-12065  12066 -12067  312  12069 0
-12065  12066 -12067  312 -12070 0

c  -2-1 --> break 
c    ( b^{13, 24}_2 ∧  b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨  b^{13, 24}_0 ∨  p_312 ∨ break
c  in DIMACS:
-12065 -12066  12067  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 24}_2 ∧ -b^{13, 24}_1 ∧ -b^{13, 24}_0 ∧ true) 
c  in CNF:
c    -b^{13, 24}_2 ∨  b^{13, 24}_1 ∨  b^{13, 24}_0 ∨ false 
c  in DIMACS:
-12065  12066  12067  0

c  3 does not represent an automaton state.
c    -(-b^{13, 24}_2 ∧  b^{13, 24}_1 ∧  b^{13, 24}_0 ∧ true) 
c  in CNF:
c     b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ false 
c  in DIMACS:
 12065 -12066 -12067  0
c  -3 does not represent an automaton state.
c    -( b^{13, 24}_2 ∧  b^{13, 24}_1 ∧  b^{13, 24}_0 ∧ true) 
c  in CNF:
c    -b^{13, 24}_2 ∨ -b^{13, 24}_1 ∨ -b^{13, 24}_0 ∨ false 
c  in DIMACS:
-12065 -12066 -12067  0

c i = 25
c  -2+1 --> -1
c    ( b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧  p_325) -> ( b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0)
c  in CNF:
c    -b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨  b^{13, 26}_2
c    -b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_1
c    -b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨  b^{13, 26}_0
c  in DIMACS:
-12068 -12069  12070 -325  12071 0
-12068 -12069  12070 -325 -12072 0
-12068 -12069  12070 -325  12073 0

c  -1+1 --> 0
c    ( b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0 ∧  p_325) -> (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧ -b^{13, 26}_0)
c  in CNF:
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_2
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_1
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_0
c  in DIMACS:
-12068  12069 -12070 -325 -12071 0
-12068  12069 -12070 -325 -12072 0
-12068  12069 -12070 -325 -12073 0

c  0+1 --> 1
c    (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧  p_325) -> (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0)
c  in CNF:
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_2
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_1
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨  b^{13, 26}_0
c  in DIMACS:
 12068  12069  12070 -325 -12071 0
 12068  12069  12070 -325 -12072 0
 12068  12069  12070 -325  12073 0

c  1+1 --> 2
c    (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0 ∧  p_325) -> (-b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0)
c  in CNF:
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_2
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨  b^{13, 26}_1
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ -p_325 ∨ -b^{13, 26}_0
c  in DIMACS:
 12068  12069 -12070 -325 -12071 0
 12068  12069 -12070 -325  12072 0
 12068  12069 -12070 -325 -12073 0

c  2+1 --> break 
c    (-b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧  p_325) -> break
c  in CNF:
c     b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 12068 -12069  12070 -325 1162 0


c  2-1 --> 1
c    (-b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧ -p_325) -> (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0)
c  in CNF:
c     b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_2
c     b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_1
c     b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨  b^{13, 26}_0
c  in DIMACS:
 12068 -12069  12070  325 -12071 0
 12068 -12069  12070  325 -12072 0
 12068 -12069  12070  325  12073 0

c  1-1 --> 0
c    (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0 ∧ -p_325) -> (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧ -b^{13, 26}_0)
c  in CNF:
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_2
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_1
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_0
c  in DIMACS:
 12068  12069 -12070  325 -12071 0
 12068  12069 -12070  325 -12072 0
 12068  12069 -12070  325 -12073 0

c  0-1 --> -1
c    (-b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧ -p_325) -> ( b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0)
c  in CNF:
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨  b^{13, 26}_2
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_1
c     b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨  b^{13, 26}_0
c  in DIMACS:
 12068  12069  12070  325  12071 0
 12068  12069  12070  325 -12072 0
 12068  12069  12070  325  12073 0

c  -1-1 --> -2
c    ( b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧  b^{13, 25}_0 ∧ -p_325) -> ( b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0)
c  in CNF:
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨  b^{13, 26}_2
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨  b^{13, 26}_1
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨  p_325 ∨ -b^{13, 26}_0
c  in DIMACS:
-12068  12069 -12070  325  12071 0
-12068  12069 -12070  325  12072 0
-12068  12069 -12070  325 -12073 0

c  -2-1 --> break 
c    ( b^{13, 25}_2 ∧  b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨  b^{13, 25}_0 ∨  p_325 ∨ break
c  in DIMACS:
-12068 -12069  12070  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 25}_2 ∧ -b^{13, 25}_1 ∧ -b^{13, 25}_0 ∧ true) 
c  in CNF:
c    -b^{13, 25}_2 ∨  b^{13, 25}_1 ∨  b^{13, 25}_0 ∨ false 
c  in DIMACS:
-12068  12069  12070  0

c  3 does not represent an automaton state.
c    -(-b^{13, 25}_2 ∧  b^{13, 25}_1 ∧  b^{13, 25}_0 ∧ true) 
c  in CNF:
c     b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ false 
c  in DIMACS:
 12068 -12069 -12070  0
c  -3 does not represent an automaton state.
c    -( b^{13, 25}_2 ∧  b^{13, 25}_1 ∧  b^{13, 25}_0 ∧ true) 
c  in CNF:
c    -b^{13, 25}_2 ∨ -b^{13, 25}_1 ∨ -b^{13, 25}_0 ∨ false 
c  in DIMACS:
-12068 -12069 -12070  0

c i = 26
c  -2+1 --> -1
c    ( b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧  p_338) -> ( b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0)
c  in CNF:
c    -b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨  b^{13, 27}_2
c    -b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_1
c    -b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨  b^{13, 27}_0
c  in DIMACS:
-12071 -12072  12073 -338  12074 0
-12071 -12072  12073 -338 -12075 0
-12071 -12072  12073 -338  12076 0

c  -1+1 --> 0
c    ( b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0 ∧  p_338) -> (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧ -b^{13, 27}_0)
c  in CNF:
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_2
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_1
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_0
c  in DIMACS:
-12071  12072 -12073 -338 -12074 0
-12071  12072 -12073 -338 -12075 0
-12071  12072 -12073 -338 -12076 0

c  0+1 --> 1
c    (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧  p_338) -> (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0)
c  in CNF:
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_2
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_1
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨  b^{13, 27}_0
c  in DIMACS:
 12071  12072  12073 -338 -12074 0
 12071  12072  12073 -338 -12075 0
 12071  12072  12073 -338  12076 0

c  1+1 --> 2
c    (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0 ∧  p_338) -> (-b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0)
c  in CNF:
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_2
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨  b^{13, 27}_1
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ -p_338 ∨ -b^{13, 27}_0
c  in DIMACS:
 12071  12072 -12073 -338 -12074 0
 12071  12072 -12073 -338  12075 0
 12071  12072 -12073 -338 -12076 0

c  2+1 --> break 
c    (-b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧  p_338) -> break
c  in CNF:
c     b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 12071 -12072  12073 -338 1162 0


c  2-1 --> 1
c    (-b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧ -p_338) -> (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0)
c  in CNF:
c     b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_2
c     b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_1
c     b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨  b^{13, 27}_0
c  in DIMACS:
 12071 -12072  12073  338 -12074 0
 12071 -12072  12073  338 -12075 0
 12071 -12072  12073  338  12076 0

c  1-1 --> 0
c    (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0 ∧ -p_338) -> (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧ -b^{13, 27}_0)
c  in CNF:
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_2
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_1
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_0
c  in DIMACS:
 12071  12072 -12073  338 -12074 0
 12071  12072 -12073  338 -12075 0
 12071  12072 -12073  338 -12076 0

c  0-1 --> -1
c    (-b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧ -p_338) -> ( b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0)
c  in CNF:
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨  b^{13, 27}_2
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_1
c     b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨  b^{13, 27}_0
c  in DIMACS:
 12071  12072  12073  338  12074 0
 12071  12072  12073  338 -12075 0
 12071  12072  12073  338  12076 0

c  -1-1 --> -2
c    ( b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧  b^{13, 26}_0 ∧ -p_338) -> ( b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0)
c  in CNF:
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨  b^{13, 27}_2
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨  b^{13, 27}_1
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨  p_338 ∨ -b^{13, 27}_0
c  in DIMACS:
-12071  12072 -12073  338  12074 0
-12071  12072 -12073  338  12075 0
-12071  12072 -12073  338 -12076 0

c  -2-1 --> break 
c    ( b^{13, 26}_2 ∧  b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨  b^{13, 26}_0 ∨  p_338 ∨ break
c  in DIMACS:
-12071 -12072  12073  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 26}_2 ∧ -b^{13, 26}_1 ∧ -b^{13, 26}_0 ∧ true) 
c  in CNF:
c    -b^{13, 26}_2 ∨  b^{13, 26}_1 ∨  b^{13, 26}_0 ∨ false 
c  in DIMACS:
-12071  12072  12073  0

c  3 does not represent an automaton state.
c    -(-b^{13, 26}_2 ∧  b^{13, 26}_1 ∧  b^{13, 26}_0 ∧ true) 
c  in CNF:
c     b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ false 
c  in DIMACS:
 12071 -12072 -12073  0
c  -3 does not represent an automaton state.
c    -( b^{13, 26}_2 ∧  b^{13, 26}_1 ∧  b^{13, 26}_0 ∧ true) 
c  in CNF:
c    -b^{13, 26}_2 ∨ -b^{13, 26}_1 ∨ -b^{13, 26}_0 ∨ false 
c  in DIMACS:
-12071 -12072 -12073  0

c i = 27
c  -2+1 --> -1
c    ( b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧  p_351) -> ( b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0)
c  in CNF:
c    -b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨  b^{13, 28}_2
c    -b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_1
c    -b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨  b^{13, 28}_0
c  in DIMACS:
-12074 -12075  12076 -351  12077 0
-12074 -12075  12076 -351 -12078 0
-12074 -12075  12076 -351  12079 0

c  -1+1 --> 0
c    ( b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0 ∧  p_351) -> (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧ -b^{13, 28}_0)
c  in CNF:
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_2
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_1
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_0
c  in DIMACS:
-12074  12075 -12076 -351 -12077 0
-12074  12075 -12076 -351 -12078 0
-12074  12075 -12076 -351 -12079 0

c  0+1 --> 1
c    (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧  p_351) -> (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0)
c  in CNF:
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_2
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_1
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨  b^{13, 28}_0
c  in DIMACS:
 12074  12075  12076 -351 -12077 0
 12074  12075  12076 -351 -12078 0
 12074  12075  12076 -351  12079 0

c  1+1 --> 2
c    (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0 ∧  p_351) -> (-b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0)
c  in CNF:
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_2
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨  b^{13, 28}_1
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ -p_351 ∨ -b^{13, 28}_0
c  in DIMACS:
 12074  12075 -12076 -351 -12077 0
 12074  12075 -12076 -351  12078 0
 12074  12075 -12076 -351 -12079 0

c  2+1 --> break 
c    (-b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧  p_351) -> break
c  in CNF:
c     b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 12074 -12075  12076 -351 1162 0


c  2-1 --> 1
c    (-b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧ -p_351) -> (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0)
c  in CNF:
c     b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_2
c     b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_1
c     b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨  b^{13, 28}_0
c  in DIMACS:
 12074 -12075  12076  351 -12077 0
 12074 -12075  12076  351 -12078 0
 12074 -12075  12076  351  12079 0

c  1-1 --> 0
c    (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0 ∧ -p_351) -> (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧ -b^{13, 28}_0)
c  in CNF:
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_2
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_1
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_0
c  in DIMACS:
 12074  12075 -12076  351 -12077 0
 12074  12075 -12076  351 -12078 0
 12074  12075 -12076  351 -12079 0

c  0-1 --> -1
c    (-b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧ -p_351) -> ( b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0)
c  in CNF:
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨  b^{13, 28}_2
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_1
c     b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨  b^{13, 28}_0
c  in DIMACS:
 12074  12075  12076  351  12077 0
 12074  12075  12076  351 -12078 0
 12074  12075  12076  351  12079 0

c  -1-1 --> -2
c    ( b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧  b^{13, 27}_0 ∧ -p_351) -> ( b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0)
c  in CNF:
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨  b^{13, 28}_2
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨  b^{13, 28}_1
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨  p_351 ∨ -b^{13, 28}_0
c  in DIMACS:
-12074  12075 -12076  351  12077 0
-12074  12075 -12076  351  12078 0
-12074  12075 -12076  351 -12079 0

c  -2-1 --> break 
c    ( b^{13, 27}_2 ∧  b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨  b^{13, 27}_0 ∨  p_351 ∨ break
c  in DIMACS:
-12074 -12075  12076  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 27}_2 ∧ -b^{13, 27}_1 ∧ -b^{13, 27}_0 ∧ true) 
c  in CNF:
c    -b^{13, 27}_2 ∨  b^{13, 27}_1 ∨  b^{13, 27}_0 ∨ false 
c  in DIMACS:
-12074  12075  12076  0

c  3 does not represent an automaton state.
c    -(-b^{13, 27}_2 ∧  b^{13, 27}_1 ∧  b^{13, 27}_0 ∧ true) 
c  in CNF:
c     b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ false 
c  in DIMACS:
 12074 -12075 -12076  0
c  -3 does not represent an automaton state.
c    -( b^{13, 27}_2 ∧  b^{13, 27}_1 ∧  b^{13, 27}_0 ∧ true) 
c  in CNF:
c    -b^{13, 27}_2 ∨ -b^{13, 27}_1 ∨ -b^{13, 27}_0 ∨ false 
c  in DIMACS:
-12074 -12075 -12076  0

c i = 28
c  -2+1 --> -1
c    ( b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧  p_364) -> ( b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0)
c  in CNF:
c    -b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨  b^{13, 29}_2
c    -b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_1
c    -b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨  b^{13, 29}_0
c  in DIMACS:
-12077 -12078  12079 -364  12080 0
-12077 -12078  12079 -364 -12081 0
-12077 -12078  12079 -364  12082 0

c  -1+1 --> 0
c    ( b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0 ∧  p_364) -> (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧ -b^{13, 29}_0)
c  in CNF:
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_2
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_1
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_0
c  in DIMACS:
-12077  12078 -12079 -364 -12080 0
-12077  12078 -12079 -364 -12081 0
-12077  12078 -12079 -364 -12082 0

c  0+1 --> 1
c    (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧  p_364) -> (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0)
c  in CNF:
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_2
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_1
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨  b^{13, 29}_0
c  in DIMACS:
 12077  12078  12079 -364 -12080 0
 12077  12078  12079 -364 -12081 0
 12077  12078  12079 -364  12082 0

c  1+1 --> 2
c    (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0 ∧  p_364) -> (-b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0)
c  in CNF:
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_2
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨  b^{13, 29}_1
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ -p_364 ∨ -b^{13, 29}_0
c  in DIMACS:
 12077  12078 -12079 -364 -12080 0
 12077  12078 -12079 -364  12081 0
 12077  12078 -12079 -364 -12082 0

c  2+1 --> break 
c    (-b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧  p_364) -> break
c  in CNF:
c     b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 12077 -12078  12079 -364 1162 0


c  2-1 --> 1
c    (-b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧ -p_364) -> (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0)
c  in CNF:
c     b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_2
c     b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_1
c     b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨  b^{13, 29}_0
c  in DIMACS:
 12077 -12078  12079  364 -12080 0
 12077 -12078  12079  364 -12081 0
 12077 -12078  12079  364  12082 0

c  1-1 --> 0
c    (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0 ∧ -p_364) -> (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧ -b^{13, 29}_0)
c  in CNF:
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_2
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_1
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_0
c  in DIMACS:
 12077  12078 -12079  364 -12080 0
 12077  12078 -12079  364 -12081 0
 12077  12078 -12079  364 -12082 0

c  0-1 --> -1
c    (-b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧ -p_364) -> ( b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0)
c  in CNF:
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨  b^{13, 29}_2
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_1
c     b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨  b^{13, 29}_0
c  in DIMACS:
 12077  12078  12079  364  12080 0
 12077  12078  12079  364 -12081 0
 12077  12078  12079  364  12082 0

c  -1-1 --> -2
c    ( b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧  b^{13, 28}_0 ∧ -p_364) -> ( b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0)
c  in CNF:
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨  b^{13, 29}_2
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨  b^{13, 29}_1
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨  p_364 ∨ -b^{13, 29}_0
c  in DIMACS:
-12077  12078 -12079  364  12080 0
-12077  12078 -12079  364  12081 0
-12077  12078 -12079  364 -12082 0

c  -2-1 --> break 
c    ( b^{13, 28}_2 ∧  b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨  b^{13, 28}_0 ∨  p_364 ∨ break
c  in DIMACS:
-12077 -12078  12079  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 28}_2 ∧ -b^{13, 28}_1 ∧ -b^{13, 28}_0 ∧ true) 
c  in CNF:
c    -b^{13, 28}_2 ∨  b^{13, 28}_1 ∨  b^{13, 28}_0 ∨ false 
c  in DIMACS:
-12077  12078  12079  0

c  3 does not represent an automaton state.
c    -(-b^{13, 28}_2 ∧  b^{13, 28}_1 ∧  b^{13, 28}_0 ∧ true) 
c  in CNF:
c     b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ false 
c  in DIMACS:
 12077 -12078 -12079  0
c  -3 does not represent an automaton state.
c    -( b^{13, 28}_2 ∧  b^{13, 28}_1 ∧  b^{13, 28}_0 ∧ true) 
c  in CNF:
c    -b^{13, 28}_2 ∨ -b^{13, 28}_1 ∨ -b^{13, 28}_0 ∨ false 
c  in DIMACS:
-12077 -12078 -12079  0

c i = 29
c  -2+1 --> -1
c    ( b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧  p_377) -> ( b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0)
c  in CNF:
c    -b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨  b^{13, 30}_2
c    -b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_1
c    -b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨  b^{13, 30}_0
c  in DIMACS:
-12080 -12081  12082 -377  12083 0
-12080 -12081  12082 -377 -12084 0
-12080 -12081  12082 -377  12085 0

c  -1+1 --> 0
c    ( b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0 ∧  p_377) -> (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧ -b^{13, 30}_0)
c  in CNF:
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_2
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_1
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_0
c  in DIMACS:
-12080  12081 -12082 -377 -12083 0
-12080  12081 -12082 -377 -12084 0
-12080  12081 -12082 -377 -12085 0

c  0+1 --> 1
c    (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧  p_377) -> (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0)
c  in CNF:
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_2
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_1
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨  b^{13, 30}_0
c  in DIMACS:
 12080  12081  12082 -377 -12083 0
 12080  12081  12082 -377 -12084 0
 12080  12081  12082 -377  12085 0

c  1+1 --> 2
c    (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0 ∧  p_377) -> (-b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0)
c  in CNF:
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_2
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨  b^{13, 30}_1
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ -p_377 ∨ -b^{13, 30}_0
c  in DIMACS:
 12080  12081 -12082 -377 -12083 0
 12080  12081 -12082 -377  12084 0
 12080  12081 -12082 -377 -12085 0

c  2+1 --> break 
c    (-b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧  p_377) -> break
c  in CNF:
c     b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ -p_377 ∨ break
c  in DIMACS:
 12080 -12081  12082 -377 1162 0


c  2-1 --> 1
c    (-b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧ -p_377) -> (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0)
c  in CNF:
c     b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_2
c     b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_1
c     b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨  b^{13, 30}_0
c  in DIMACS:
 12080 -12081  12082  377 -12083 0
 12080 -12081  12082  377 -12084 0
 12080 -12081  12082  377  12085 0

c  1-1 --> 0
c    (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0 ∧ -p_377) -> (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧ -b^{13, 30}_0)
c  in CNF:
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_2
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_1
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_0
c  in DIMACS:
 12080  12081 -12082  377 -12083 0
 12080  12081 -12082  377 -12084 0
 12080  12081 -12082  377 -12085 0

c  0-1 --> -1
c    (-b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧ -p_377) -> ( b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0)
c  in CNF:
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨  b^{13, 30}_2
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_1
c     b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨  b^{13, 30}_0
c  in DIMACS:
 12080  12081  12082  377  12083 0
 12080  12081  12082  377 -12084 0
 12080  12081  12082  377  12085 0

c  -1-1 --> -2
c    ( b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧  b^{13, 29}_0 ∧ -p_377) -> ( b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0)
c  in CNF:
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨  b^{13, 30}_2
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨  b^{13, 30}_1
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨  p_377 ∨ -b^{13, 30}_0
c  in DIMACS:
-12080  12081 -12082  377  12083 0
-12080  12081 -12082  377  12084 0
-12080  12081 -12082  377 -12085 0

c  -2-1 --> break 
c    ( b^{13, 29}_2 ∧  b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧ -p_377) -> break
c  in CNF:
c    -b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨  b^{13, 29}_0 ∨  p_377 ∨ break
c  in DIMACS:
-12080 -12081  12082  377 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 29}_2 ∧ -b^{13, 29}_1 ∧ -b^{13, 29}_0 ∧ true) 
c  in CNF:
c    -b^{13, 29}_2 ∨  b^{13, 29}_1 ∨  b^{13, 29}_0 ∨ false 
c  in DIMACS:
-12080  12081  12082  0

c  3 does not represent an automaton state.
c    -(-b^{13, 29}_2 ∧  b^{13, 29}_1 ∧  b^{13, 29}_0 ∧ true) 
c  in CNF:
c     b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ false 
c  in DIMACS:
 12080 -12081 -12082  0
c  -3 does not represent an automaton state.
c    -( b^{13, 29}_2 ∧  b^{13, 29}_1 ∧  b^{13, 29}_0 ∧ true) 
c  in CNF:
c    -b^{13, 29}_2 ∨ -b^{13, 29}_1 ∨ -b^{13, 29}_0 ∨ false 
c  in DIMACS:
-12080 -12081 -12082  0

c i = 30
c  -2+1 --> -1
c    ( b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧  p_390) -> ( b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0)
c  in CNF:
c    -b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨  b^{13, 31}_2
c    -b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_1
c    -b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨  b^{13, 31}_0
c  in DIMACS:
-12083 -12084  12085 -390  12086 0
-12083 -12084  12085 -390 -12087 0
-12083 -12084  12085 -390  12088 0

c  -1+1 --> 0
c    ( b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0 ∧  p_390) -> (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧ -b^{13, 31}_0)
c  in CNF:
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_2
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_1
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_0
c  in DIMACS:
-12083  12084 -12085 -390 -12086 0
-12083  12084 -12085 -390 -12087 0
-12083  12084 -12085 -390 -12088 0

c  0+1 --> 1
c    (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧  p_390) -> (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0)
c  in CNF:
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_2
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_1
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨  b^{13, 31}_0
c  in DIMACS:
 12083  12084  12085 -390 -12086 0
 12083  12084  12085 -390 -12087 0
 12083  12084  12085 -390  12088 0

c  1+1 --> 2
c    (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0 ∧  p_390) -> (-b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0)
c  in CNF:
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_2
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨  b^{13, 31}_1
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ -p_390 ∨ -b^{13, 31}_0
c  in DIMACS:
 12083  12084 -12085 -390 -12086 0
 12083  12084 -12085 -390  12087 0
 12083  12084 -12085 -390 -12088 0

c  2+1 --> break 
c    (-b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧  p_390) -> break
c  in CNF:
c     b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 12083 -12084  12085 -390 1162 0


c  2-1 --> 1
c    (-b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧ -p_390) -> (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0)
c  in CNF:
c     b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_2
c     b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_1
c     b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨  b^{13, 31}_0
c  in DIMACS:
 12083 -12084  12085  390 -12086 0
 12083 -12084  12085  390 -12087 0
 12083 -12084  12085  390  12088 0

c  1-1 --> 0
c    (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0 ∧ -p_390) -> (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧ -b^{13, 31}_0)
c  in CNF:
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_2
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_1
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_0
c  in DIMACS:
 12083  12084 -12085  390 -12086 0
 12083  12084 -12085  390 -12087 0
 12083  12084 -12085  390 -12088 0

c  0-1 --> -1
c    (-b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧ -p_390) -> ( b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0)
c  in CNF:
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨  b^{13, 31}_2
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_1
c     b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨  b^{13, 31}_0
c  in DIMACS:
 12083  12084  12085  390  12086 0
 12083  12084  12085  390 -12087 0
 12083  12084  12085  390  12088 0

c  -1-1 --> -2
c    ( b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧  b^{13, 30}_0 ∧ -p_390) -> ( b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0)
c  in CNF:
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨  b^{13, 31}_2
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨  b^{13, 31}_1
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨  p_390 ∨ -b^{13, 31}_0
c  in DIMACS:
-12083  12084 -12085  390  12086 0
-12083  12084 -12085  390  12087 0
-12083  12084 -12085  390 -12088 0

c  -2-1 --> break 
c    ( b^{13, 30}_2 ∧  b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨  b^{13, 30}_0 ∨  p_390 ∨ break
c  in DIMACS:
-12083 -12084  12085  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 30}_2 ∧ -b^{13, 30}_1 ∧ -b^{13, 30}_0 ∧ true) 
c  in CNF:
c    -b^{13, 30}_2 ∨  b^{13, 30}_1 ∨  b^{13, 30}_0 ∨ false 
c  in DIMACS:
-12083  12084  12085  0

c  3 does not represent an automaton state.
c    -(-b^{13, 30}_2 ∧  b^{13, 30}_1 ∧  b^{13, 30}_0 ∧ true) 
c  in CNF:
c     b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ false 
c  in DIMACS:
 12083 -12084 -12085  0
c  -3 does not represent an automaton state.
c    -( b^{13, 30}_2 ∧  b^{13, 30}_1 ∧  b^{13, 30}_0 ∧ true) 
c  in CNF:
c    -b^{13, 30}_2 ∨ -b^{13, 30}_1 ∨ -b^{13, 30}_0 ∨ false 
c  in DIMACS:
-12083 -12084 -12085  0

c i = 31
c  -2+1 --> -1
c    ( b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧  p_403) -> ( b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0)
c  in CNF:
c    -b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨  b^{13, 32}_2
c    -b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_1
c    -b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨  b^{13, 32}_0
c  in DIMACS:
-12086 -12087  12088 -403  12089 0
-12086 -12087  12088 -403 -12090 0
-12086 -12087  12088 -403  12091 0

c  -1+1 --> 0
c    ( b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0 ∧  p_403) -> (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧ -b^{13, 32}_0)
c  in CNF:
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_2
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_1
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_0
c  in DIMACS:
-12086  12087 -12088 -403 -12089 0
-12086  12087 -12088 -403 -12090 0
-12086  12087 -12088 -403 -12091 0

c  0+1 --> 1
c    (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧  p_403) -> (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0)
c  in CNF:
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_2
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_1
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨  b^{13, 32}_0
c  in DIMACS:
 12086  12087  12088 -403 -12089 0
 12086  12087  12088 -403 -12090 0
 12086  12087  12088 -403  12091 0

c  1+1 --> 2
c    (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0 ∧  p_403) -> (-b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0)
c  in CNF:
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_2
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨  b^{13, 32}_1
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ -p_403 ∨ -b^{13, 32}_0
c  in DIMACS:
 12086  12087 -12088 -403 -12089 0
 12086  12087 -12088 -403  12090 0
 12086  12087 -12088 -403 -12091 0

c  2+1 --> break 
c    (-b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧  p_403) -> break
c  in CNF:
c     b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ -p_403 ∨ break
c  in DIMACS:
 12086 -12087  12088 -403 1162 0


c  2-1 --> 1
c    (-b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧ -p_403) -> (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0)
c  in CNF:
c     b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_2
c     b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_1
c     b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨  b^{13, 32}_0
c  in DIMACS:
 12086 -12087  12088  403 -12089 0
 12086 -12087  12088  403 -12090 0
 12086 -12087  12088  403  12091 0

c  1-1 --> 0
c    (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0 ∧ -p_403) -> (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧ -b^{13, 32}_0)
c  in CNF:
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_2
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_1
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_0
c  in DIMACS:
 12086  12087 -12088  403 -12089 0
 12086  12087 -12088  403 -12090 0
 12086  12087 -12088  403 -12091 0

c  0-1 --> -1
c    (-b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧ -p_403) -> ( b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0)
c  in CNF:
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨  b^{13, 32}_2
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_1
c     b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨  b^{13, 32}_0
c  in DIMACS:
 12086  12087  12088  403  12089 0
 12086  12087  12088  403 -12090 0
 12086  12087  12088  403  12091 0

c  -1-1 --> -2
c    ( b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧  b^{13, 31}_0 ∧ -p_403) -> ( b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0)
c  in CNF:
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨  b^{13, 32}_2
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨  b^{13, 32}_1
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨  p_403 ∨ -b^{13, 32}_0
c  in DIMACS:
-12086  12087 -12088  403  12089 0
-12086  12087 -12088  403  12090 0
-12086  12087 -12088  403 -12091 0

c  -2-1 --> break 
c    ( b^{13, 31}_2 ∧  b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧ -p_403) -> break
c  in CNF:
c    -b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨  b^{13, 31}_0 ∨  p_403 ∨ break
c  in DIMACS:
-12086 -12087  12088  403 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 31}_2 ∧ -b^{13, 31}_1 ∧ -b^{13, 31}_0 ∧ true) 
c  in CNF:
c    -b^{13, 31}_2 ∨  b^{13, 31}_1 ∨  b^{13, 31}_0 ∨ false 
c  in DIMACS:
-12086  12087  12088  0

c  3 does not represent an automaton state.
c    -(-b^{13, 31}_2 ∧  b^{13, 31}_1 ∧  b^{13, 31}_0 ∧ true) 
c  in CNF:
c     b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ false 
c  in DIMACS:
 12086 -12087 -12088  0
c  -3 does not represent an automaton state.
c    -( b^{13, 31}_2 ∧  b^{13, 31}_1 ∧  b^{13, 31}_0 ∧ true) 
c  in CNF:
c    -b^{13, 31}_2 ∨ -b^{13, 31}_1 ∨ -b^{13, 31}_0 ∨ false 
c  in DIMACS:
-12086 -12087 -12088  0

c i = 32
c  -2+1 --> -1
c    ( b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧  p_416) -> ( b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0)
c  in CNF:
c    -b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨  b^{13, 33}_2
c    -b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_1
c    -b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨  b^{13, 33}_0
c  in DIMACS:
-12089 -12090  12091 -416  12092 0
-12089 -12090  12091 -416 -12093 0
-12089 -12090  12091 -416  12094 0

c  -1+1 --> 0
c    ( b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0 ∧  p_416) -> (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧ -b^{13, 33}_0)
c  in CNF:
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_2
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_1
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_0
c  in DIMACS:
-12089  12090 -12091 -416 -12092 0
-12089  12090 -12091 -416 -12093 0
-12089  12090 -12091 -416 -12094 0

c  0+1 --> 1
c    (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧  p_416) -> (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0)
c  in CNF:
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_2
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_1
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨  b^{13, 33}_0
c  in DIMACS:
 12089  12090  12091 -416 -12092 0
 12089  12090  12091 -416 -12093 0
 12089  12090  12091 -416  12094 0

c  1+1 --> 2
c    (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0 ∧  p_416) -> (-b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0)
c  in CNF:
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_2
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨  b^{13, 33}_1
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ -p_416 ∨ -b^{13, 33}_0
c  in DIMACS:
 12089  12090 -12091 -416 -12092 0
 12089  12090 -12091 -416  12093 0
 12089  12090 -12091 -416 -12094 0

c  2+1 --> break 
c    (-b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧  p_416) -> break
c  in CNF:
c     b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 12089 -12090  12091 -416 1162 0


c  2-1 --> 1
c    (-b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧ -p_416) -> (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0)
c  in CNF:
c     b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_2
c     b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_1
c     b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨  b^{13, 33}_0
c  in DIMACS:
 12089 -12090  12091  416 -12092 0
 12089 -12090  12091  416 -12093 0
 12089 -12090  12091  416  12094 0

c  1-1 --> 0
c    (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0 ∧ -p_416) -> (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧ -b^{13, 33}_0)
c  in CNF:
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_2
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_1
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_0
c  in DIMACS:
 12089  12090 -12091  416 -12092 0
 12089  12090 -12091  416 -12093 0
 12089  12090 -12091  416 -12094 0

c  0-1 --> -1
c    (-b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧ -p_416) -> ( b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0)
c  in CNF:
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨  b^{13, 33}_2
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_1
c     b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨  b^{13, 33}_0
c  in DIMACS:
 12089  12090  12091  416  12092 0
 12089  12090  12091  416 -12093 0
 12089  12090  12091  416  12094 0

c  -1-1 --> -2
c    ( b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧  b^{13, 32}_0 ∧ -p_416) -> ( b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0)
c  in CNF:
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨  b^{13, 33}_2
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨  b^{13, 33}_1
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨  p_416 ∨ -b^{13, 33}_0
c  in DIMACS:
-12089  12090 -12091  416  12092 0
-12089  12090 -12091  416  12093 0
-12089  12090 -12091  416 -12094 0

c  -2-1 --> break 
c    ( b^{13, 32}_2 ∧  b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨  b^{13, 32}_0 ∨  p_416 ∨ break
c  in DIMACS:
-12089 -12090  12091  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 32}_2 ∧ -b^{13, 32}_1 ∧ -b^{13, 32}_0 ∧ true) 
c  in CNF:
c    -b^{13, 32}_2 ∨  b^{13, 32}_1 ∨  b^{13, 32}_0 ∨ false 
c  in DIMACS:
-12089  12090  12091  0

c  3 does not represent an automaton state.
c    -(-b^{13, 32}_2 ∧  b^{13, 32}_1 ∧  b^{13, 32}_0 ∧ true) 
c  in CNF:
c     b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ false 
c  in DIMACS:
 12089 -12090 -12091  0
c  -3 does not represent an automaton state.
c    -( b^{13, 32}_2 ∧  b^{13, 32}_1 ∧  b^{13, 32}_0 ∧ true) 
c  in CNF:
c    -b^{13, 32}_2 ∨ -b^{13, 32}_1 ∨ -b^{13, 32}_0 ∨ false 
c  in DIMACS:
-12089 -12090 -12091  0

c i = 33
c  -2+1 --> -1
c    ( b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧  p_429) -> ( b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0)
c  in CNF:
c    -b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨  b^{13, 34}_2
c    -b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_1
c    -b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨  b^{13, 34}_0
c  in DIMACS:
-12092 -12093  12094 -429  12095 0
-12092 -12093  12094 -429 -12096 0
-12092 -12093  12094 -429  12097 0

c  -1+1 --> 0
c    ( b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0 ∧  p_429) -> (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧ -b^{13, 34}_0)
c  in CNF:
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_2
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_1
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_0
c  in DIMACS:
-12092  12093 -12094 -429 -12095 0
-12092  12093 -12094 -429 -12096 0
-12092  12093 -12094 -429 -12097 0

c  0+1 --> 1
c    (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧  p_429) -> (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0)
c  in CNF:
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_2
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_1
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨  b^{13, 34}_0
c  in DIMACS:
 12092  12093  12094 -429 -12095 0
 12092  12093  12094 -429 -12096 0
 12092  12093  12094 -429  12097 0

c  1+1 --> 2
c    (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0 ∧  p_429) -> (-b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0)
c  in CNF:
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_2
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨  b^{13, 34}_1
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ -p_429 ∨ -b^{13, 34}_0
c  in DIMACS:
 12092  12093 -12094 -429 -12095 0
 12092  12093 -12094 -429  12096 0
 12092  12093 -12094 -429 -12097 0

c  2+1 --> break 
c    (-b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧  p_429) -> break
c  in CNF:
c     b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 12092 -12093  12094 -429 1162 0


c  2-1 --> 1
c    (-b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧ -p_429) -> (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0)
c  in CNF:
c     b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_2
c     b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_1
c     b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨  b^{13, 34}_0
c  in DIMACS:
 12092 -12093  12094  429 -12095 0
 12092 -12093  12094  429 -12096 0
 12092 -12093  12094  429  12097 0

c  1-1 --> 0
c    (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0 ∧ -p_429) -> (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧ -b^{13, 34}_0)
c  in CNF:
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_2
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_1
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_0
c  in DIMACS:
 12092  12093 -12094  429 -12095 0
 12092  12093 -12094  429 -12096 0
 12092  12093 -12094  429 -12097 0

c  0-1 --> -1
c    (-b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧ -p_429) -> ( b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0)
c  in CNF:
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨  b^{13, 34}_2
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_1
c     b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨  b^{13, 34}_0
c  in DIMACS:
 12092  12093  12094  429  12095 0
 12092  12093  12094  429 -12096 0
 12092  12093  12094  429  12097 0

c  -1-1 --> -2
c    ( b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧  b^{13, 33}_0 ∧ -p_429) -> ( b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0)
c  in CNF:
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨  b^{13, 34}_2
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨  b^{13, 34}_1
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨  p_429 ∨ -b^{13, 34}_0
c  in DIMACS:
-12092  12093 -12094  429  12095 0
-12092  12093 -12094  429  12096 0
-12092  12093 -12094  429 -12097 0

c  -2-1 --> break 
c    ( b^{13, 33}_2 ∧  b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨  b^{13, 33}_0 ∨  p_429 ∨ break
c  in DIMACS:
-12092 -12093  12094  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 33}_2 ∧ -b^{13, 33}_1 ∧ -b^{13, 33}_0 ∧ true) 
c  in CNF:
c    -b^{13, 33}_2 ∨  b^{13, 33}_1 ∨  b^{13, 33}_0 ∨ false 
c  in DIMACS:
-12092  12093  12094  0

c  3 does not represent an automaton state.
c    -(-b^{13, 33}_2 ∧  b^{13, 33}_1 ∧  b^{13, 33}_0 ∧ true) 
c  in CNF:
c     b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ false 
c  in DIMACS:
 12092 -12093 -12094  0
c  -3 does not represent an automaton state.
c    -( b^{13, 33}_2 ∧  b^{13, 33}_1 ∧  b^{13, 33}_0 ∧ true) 
c  in CNF:
c    -b^{13, 33}_2 ∨ -b^{13, 33}_1 ∨ -b^{13, 33}_0 ∨ false 
c  in DIMACS:
-12092 -12093 -12094  0

c i = 34
c  -2+1 --> -1
c    ( b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧  p_442) -> ( b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0)
c  in CNF:
c    -b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨  b^{13, 35}_2
c    -b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_1
c    -b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨  b^{13, 35}_0
c  in DIMACS:
-12095 -12096  12097 -442  12098 0
-12095 -12096  12097 -442 -12099 0
-12095 -12096  12097 -442  12100 0

c  -1+1 --> 0
c    ( b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0 ∧  p_442) -> (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧ -b^{13, 35}_0)
c  in CNF:
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_2
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_1
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_0
c  in DIMACS:
-12095  12096 -12097 -442 -12098 0
-12095  12096 -12097 -442 -12099 0
-12095  12096 -12097 -442 -12100 0

c  0+1 --> 1
c    (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧  p_442) -> (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0)
c  in CNF:
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_2
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_1
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨  b^{13, 35}_0
c  in DIMACS:
 12095  12096  12097 -442 -12098 0
 12095  12096  12097 -442 -12099 0
 12095  12096  12097 -442  12100 0

c  1+1 --> 2
c    (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0 ∧  p_442) -> (-b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0)
c  in CNF:
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_2
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨  b^{13, 35}_1
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ -p_442 ∨ -b^{13, 35}_0
c  in DIMACS:
 12095  12096 -12097 -442 -12098 0
 12095  12096 -12097 -442  12099 0
 12095  12096 -12097 -442 -12100 0

c  2+1 --> break 
c    (-b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧  p_442) -> break
c  in CNF:
c     b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 12095 -12096  12097 -442 1162 0


c  2-1 --> 1
c    (-b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧ -p_442) -> (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0)
c  in CNF:
c     b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_2
c     b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_1
c     b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨  b^{13, 35}_0
c  in DIMACS:
 12095 -12096  12097  442 -12098 0
 12095 -12096  12097  442 -12099 0
 12095 -12096  12097  442  12100 0

c  1-1 --> 0
c    (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0 ∧ -p_442) -> (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧ -b^{13, 35}_0)
c  in CNF:
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_2
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_1
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_0
c  in DIMACS:
 12095  12096 -12097  442 -12098 0
 12095  12096 -12097  442 -12099 0
 12095  12096 -12097  442 -12100 0

c  0-1 --> -1
c    (-b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧ -p_442) -> ( b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0)
c  in CNF:
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨  b^{13, 35}_2
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_1
c     b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨  b^{13, 35}_0
c  in DIMACS:
 12095  12096  12097  442  12098 0
 12095  12096  12097  442 -12099 0
 12095  12096  12097  442  12100 0

c  -1-1 --> -2
c    ( b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧  b^{13, 34}_0 ∧ -p_442) -> ( b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0)
c  in CNF:
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨  b^{13, 35}_2
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨  b^{13, 35}_1
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨  p_442 ∨ -b^{13, 35}_0
c  in DIMACS:
-12095  12096 -12097  442  12098 0
-12095  12096 -12097  442  12099 0
-12095  12096 -12097  442 -12100 0

c  -2-1 --> break 
c    ( b^{13, 34}_2 ∧  b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨  b^{13, 34}_0 ∨  p_442 ∨ break
c  in DIMACS:
-12095 -12096  12097  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 34}_2 ∧ -b^{13, 34}_1 ∧ -b^{13, 34}_0 ∧ true) 
c  in CNF:
c    -b^{13, 34}_2 ∨  b^{13, 34}_1 ∨  b^{13, 34}_0 ∨ false 
c  in DIMACS:
-12095  12096  12097  0

c  3 does not represent an automaton state.
c    -(-b^{13, 34}_2 ∧  b^{13, 34}_1 ∧  b^{13, 34}_0 ∧ true) 
c  in CNF:
c     b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ false 
c  in DIMACS:
 12095 -12096 -12097  0
c  -3 does not represent an automaton state.
c    -( b^{13, 34}_2 ∧  b^{13, 34}_1 ∧  b^{13, 34}_0 ∧ true) 
c  in CNF:
c    -b^{13, 34}_2 ∨ -b^{13, 34}_1 ∨ -b^{13, 34}_0 ∨ false 
c  in DIMACS:
-12095 -12096 -12097  0

c i = 35
c  -2+1 --> -1
c    ( b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧  p_455) -> ( b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0)
c  in CNF:
c    -b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨  b^{13, 36}_2
c    -b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_1
c    -b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨  b^{13, 36}_0
c  in DIMACS:
-12098 -12099  12100 -455  12101 0
-12098 -12099  12100 -455 -12102 0
-12098 -12099  12100 -455  12103 0

c  -1+1 --> 0
c    ( b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0 ∧  p_455) -> (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧ -b^{13, 36}_0)
c  in CNF:
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_2
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_1
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_0
c  in DIMACS:
-12098  12099 -12100 -455 -12101 0
-12098  12099 -12100 -455 -12102 0
-12098  12099 -12100 -455 -12103 0

c  0+1 --> 1
c    (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧  p_455) -> (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0)
c  in CNF:
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_2
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_1
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨  b^{13, 36}_0
c  in DIMACS:
 12098  12099  12100 -455 -12101 0
 12098  12099  12100 -455 -12102 0
 12098  12099  12100 -455  12103 0

c  1+1 --> 2
c    (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0 ∧  p_455) -> (-b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0)
c  in CNF:
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_2
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨  b^{13, 36}_1
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ -p_455 ∨ -b^{13, 36}_0
c  in DIMACS:
 12098  12099 -12100 -455 -12101 0
 12098  12099 -12100 -455  12102 0
 12098  12099 -12100 -455 -12103 0

c  2+1 --> break 
c    (-b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧  p_455) -> break
c  in CNF:
c     b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 12098 -12099  12100 -455 1162 0


c  2-1 --> 1
c    (-b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧ -p_455) -> (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0)
c  in CNF:
c     b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_2
c     b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_1
c     b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨  b^{13, 36}_0
c  in DIMACS:
 12098 -12099  12100  455 -12101 0
 12098 -12099  12100  455 -12102 0
 12098 -12099  12100  455  12103 0

c  1-1 --> 0
c    (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0 ∧ -p_455) -> (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧ -b^{13, 36}_0)
c  in CNF:
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_2
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_1
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_0
c  in DIMACS:
 12098  12099 -12100  455 -12101 0
 12098  12099 -12100  455 -12102 0
 12098  12099 -12100  455 -12103 0

c  0-1 --> -1
c    (-b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧ -p_455) -> ( b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0)
c  in CNF:
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨  b^{13, 36}_2
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_1
c     b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨  b^{13, 36}_0
c  in DIMACS:
 12098  12099  12100  455  12101 0
 12098  12099  12100  455 -12102 0
 12098  12099  12100  455  12103 0

c  -1-1 --> -2
c    ( b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧  b^{13, 35}_0 ∧ -p_455) -> ( b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0)
c  in CNF:
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨  b^{13, 36}_2
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨  b^{13, 36}_1
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨  p_455 ∨ -b^{13, 36}_0
c  in DIMACS:
-12098  12099 -12100  455  12101 0
-12098  12099 -12100  455  12102 0
-12098  12099 -12100  455 -12103 0

c  -2-1 --> break 
c    ( b^{13, 35}_2 ∧  b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨  b^{13, 35}_0 ∨  p_455 ∨ break
c  in DIMACS:
-12098 -12099  12100  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 35}_2 ∧ -b^{13, 35}_1 ∧ -b^{13, 35}_0 ∧ true) 
c  in CNF:
c    -b^{13, 35}_2 ∨  b^{13, 35}_1 ∨  b^{13, 35}_0 ∨ false 
c  in DIMACS:
-12098  12099  12100  0

c  3 does not represent an automaton state.
c    -(-b^{13, 35}_2 ∧  b^{13, 35}_1 ∧  b^{13, 35}_0 ∧ true) 
c  in CNF:
c     b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ false 
c  in DIMACS:
 12098 -12099 -12100  0
c  -3 does not represent an automaton state.
c    -( b^{13, 35}_2 ∧  b^{13, 35}_1 ∧  b^{13, 35}_0 ∧ true) 
c  in CNF:
c    -b^{13, 35}_2 ∨ -b^{13, 35}_1 ∨ -b^{13, 35}_0 ∨ false 
c  in DIMACS:
-12098 -12099 -12100  0

c i = 36
c  -2+1 --> -1
c    ( b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧  p_468) -> ( b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0)
c  in CNF:
c    -b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨  b^{13, 37}_2
c    -b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_1
c    -b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨  b^{13, 37}_0
c  in DIMACS:
-12101 -12102  12103 -468  12104 0
-12101 -12102  12103 -468 -12105 0
-12101 -12102  12103 -468  12106 0

c  -1+1 --> 0
c    ( b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0 ∧  p_468) -> (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧ -b^{13, 37}_0)
c  in CNF:
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_2
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_1
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_0
c  in DIMACS:
-12101  12102 -12103 -468 -12104 0
-12101  12102 -12103 -468 -12105 0
-12101  12102 -12103 -468 -12106 0

c  0+1 --> 1
c    (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧  p_468) -> (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0)
c  in CNF:
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_2
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_1
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨  b^{13, 37}_0
c  in DIMACS:
 12101  12102  12103 -468 -12104 0
 12101  12102  12103 -468 -12105 0
 12101  12102  12103 -468  12106 0

c  1+1 --> 2
c    (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0 ∧  p_468) -> (-b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0)
c  in CNF:
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_2
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨  b^{13, 37}_1
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ -p_468 ∨ -b^{13, 37}_0
c  in DIMACS:
 12101  12102 -12103 -468 -12104 0
 12101  12102 -12103 -468  12105 0
 12101  12102 -12103 -468 -12106 0

c  2+1 --> break 
c    (-b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧  p_468) -> break
c  in CNF:
c     b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 12101 -12102  12103 -468 1162 0


c  2-1 --> 1
c    (-b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧ -p_468) -> (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0)
c  in CNF:
c     b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_2
c     b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_1
c     b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨  b^{13, 37}_0
c  in DIMACS:
 12101 -12102  12103  468 -12104 0
 12101 -12102  12103  468 -12105 0
 12101 -12102  12103  468  12106 0

c  1-1 --> 0
c    (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0 ∧ -p_468) -> (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧ -b^{13, 37}_0)
c  in CNF:
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_2
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_1
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_0
c  in DIMACS:
 12101  12102 -12103  468 -12104 0
 12101  12102 -12103  468 -12105 0
 12101  12102 -12103  468 -12106 0

c  0-1 --> -1
c    (-b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧ -p_468) -> ( b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0)
c  in CNF:
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨  b^{13, 37}_2
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_1
c     b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨  b^{13, 37}_0
c  in DIMACS:
 12101  12102  12103  468  12104 0
 12101  12102  12103  468 -12105 0
 12101  12102  12103  468  12106 0

c  -1-1 --> -2
c    ( b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧  b^{13, 36}_0 ∧ -p_468) -> ( b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0)
c  in CNF:
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨  b^{13, 37}_2
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨  b^{13, 37}_1
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨  p_468 ∨ -b^{13, 37}_0
c  in DIMACS:
-12101  12102 -12103  468  12104 0
-12101  12102 -12103  468  12105 0
-12101  12102 -12103  468 -12106 0

c  -2-1 --> break 
c    ( b^{13, 36}_2 ∧  b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨  b^{13, 36}_0 ∨  p_468 ∨ break
c  in DIMACS:
-12101 -12102  12103  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 36}_2 ∧ -b^{13, 36}_1 ∧ -b^{13, 36}_0 ∧ true) 
c  in CNF:
c    -b^{13, 36}_2 ∨  b^{13, 36}_1 ∨  b^{13, 36}_0 ∨ false 
c  in DIMACS:
-12101  12102  12103  0

c  3 does not represent an automaton state.
c    -(-b^{13, 36}_2 ∧  b^{13, 36}_1 ∧  b^{13, 36}_0 ∧ true) 
c  in CNF:
c     b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ false 
c  in DIMACS:
 12101 -12102 -12103  0
c  -3 does not represent an automaton state.
c    -( b^{13, 36}_2 ∧  b^{13, 36}_1 ∧  b^{13, 36}_0 ∧ true) 
c  in CNF:
c    -b^{13, 36}_2 ∨ -b^{13, 36}_1 ∨ -b^{13, 36}_0 ∨ false 
c  in DIMACS:
-12101 -12102 -12103  0

c i = 37
c  -2+1 --> -1
c    ( b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧  p_481) -> ( b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0)
c  in CNF:
c    -b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨  b^{13, 38}_2
c    -b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_1
c    -b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨  b^{13, 38}_0
c  in DIMACS:
-12104 -12105  12106 -481  12107 0
-12104 -12105  12106 -481 -12108 0
-12104 -12105  12106 -481  12109 0

c  -1+1 --> 0
c    ( b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0 ∧  p_481) -> (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧ -b^{13, 38}_0)
c  in CNF:
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_2
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_1
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_0
c  in DIMACS:
-12104  12105 -12106 -481 -12107 0
-12104  12105 -12106 -481 -12108 0
-12104  12105 -12106 -481 -12109 0

c  0+1 --> 1
c    (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧  p_481) -> (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0)
c  in CNF:
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_2
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_1
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨  b^{13, 38}_0
c  in DIMACS:
 12104  12105  12106 -481 -12107 0
 12104  12105  12106 -481 -12108 0
 12104  12105  12106 -481  12109 0

c  1+1 --> 2
c    (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0 ∧  p_481) -> (-b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0)
c  in CNF:
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_2
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨  b^{13, 38}_1
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ -p_481 ∨ -b^{13, 38}_0
c  in DIMACS:
 12104  12105 -12106 -481 -12107 0
 12104  12105 -12106 -481  12108 0
 12104  12105 -12106 -481 -12109 0

c  2+1 --> break 
c    (-b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧  p_481) -> break
c  in CNF:
c     b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ -p_481 ∨ break
c  in DIMACS:
 12104 -12105  12106 -481 1162 0


c  2-1 --> 1
c    (-b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧ -p_481) -> (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0)
c  in CNF:
c     b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_2
c     b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_1
c     b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨  b^{13, 38}_0
c  in DIMACS:
 12104 -12105  12106  481 -12107 0
 12104 -12105  12106  481 -12108 0
 12104 -12105  12106  481  12109 0

c  1-1 --> 0
c    (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0 ∧ -p_481) -> (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧ -b^{13, 38}_0)
c  in CNF:
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_2
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_1
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_0
c  in DIMACS:
 12104  12105 -12106  481 -12107 0
 12104  12105 -12106  481 -12108 0
 12104  12105 -12106  481 -12109 0

c  0-1 --> -1
c    (-b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧ -p_481) -> ( b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0)
c  in CNF:
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨  b^{13, 38}_2
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_1
c     b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨  b^{13, 38}_0
c  in DIMACS:
 12104  12105  12106  481  12107 0
 12104  12105  12106  481 -12108 0
 12104  12105  12106  481  12109 0

c  -1-1 --> -2
c    ( b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧  b^{13, 37}_0 ∧ -p_481) -> ( b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0)
c  in CNF:
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨  b^{13, 38}_2
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨  b^{13, 38}_1
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨  p_481 ∨ -b^{13, 38}_0
c  in DIMACS:
-12104  12105 -12106  481  12107 0
-12104  12105 -12106  481  12108 0
-12104  12105 -12106  481 -12109 0

c  -2-1 --> break 
c    ( b^{13, 37}_2 ∧  b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧ -p_481) -> break
c  in CNF:
c    -b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨  b^{13, 37}_0 ∨  p_481 ∨ break
c  in DIMACS:
-12104 -12105  12106  481 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 37}_2 ∧ -b^{13, 37}_1 ∧ -b^{13, 37}_0 ∧ true) 
c  in CNF:
c    -b^{13, 37}_2 ∨  b^{13, 37}_1 ∨  b^{13, 37}_0 ∨ false 
c  in DIMACS:
-12104  12105  12106  0

c  3 does not represent an automaton state.
c    -(-b^{13, 37}_2 ∧  b^{13, 37}_1 ∧  b^{13, 37}_0 ∧ true) 
c  in CNF:
c     b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ false 
c  in DIMACS:
 12104 -12105 -12106  0
c  -3 does not represent an automaton state.
c    -( b^{13, 37}_2 ∧  b^{13, 37}_1 ∧  b^{13, 37}_0 ∧ true) 
c  in CNF:
c    -b^{13, 37}_2 ∨ -b^{13, 37}_1 ∨ -b^{13, 37}_0 ∨ false 
c  in DIMACS:
-12104 -12105 -12106  0

c i = 38
c  -2+1 --> -1
c    ( b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧  p_494) -> ( b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0)
c  in CNF:
c    -b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨  b^{13, 39}_2
c    -b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_1
c    -b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨  b^{13, 39}_0
c  in DIMACS:
-12107 -12108  12109 -494  12110 0
-12107 -12108  12109 -494 -12111 0
-12107 -12108  12109 -494  12112 0

c  -1+1 --> 0
c    ( b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0 ∧  p_494) -> (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧ -b^{13, 39}_0)
c  in CNF:
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_2
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_1
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_0
c  in DIMACS:
-12107  12108 -12109 -494 -12110 0
-12107  12108 -12109 -494 -12111 0
-12107  12108 -12109 -494 -12112 0

c  0+1 --> 1
c    (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧  p_494) -> (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0)
c  in CNF:
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_2
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_1
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨  b^{13, 39}_0
c  in DIMACS:
 12107  12108  12109 -494 -12110 0
 12107  12108  12109 -494 -12111 0
 12107  12108  12109 -494  12112 0

c  1+1 --> 2
c    (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0 ∧  p_494) -> (-b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0)
c  in CNF:
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_2
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨  b^{13, 39}_1
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ -p_494 ∨ -b^{13, 39}_0
c  in DIMACS:
 12107  12108 -12109 -494 -12110 0
 12107  12108 -12109 -494  12111 0
 12107  12108 -12109 -494 -12112 0

c  2+1 --> break 
c    (-b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧  p_494) -> break
c  in CNF:
c     b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 12107 -12108  12109 -494 1162 0


c  2-1 --> 1
c    (-b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧ -p_494) -> (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0)
c  in CNF:
c     b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_2
c     b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_1
c     b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨  b^{13, 39}_0
c  in DIMACS:
 12107 -12108  12109  494 -12110 0
 12107 -12108  12109  494 -12111 0
 12107 -12108  12109  494  12112 0

c  1-1 --> 0
c    (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0 ∧ -p_494) -> (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧ -b^{13, 39}_0)
c  in CNF:
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_2
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_1
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_0
c  in DIMACS:
 12107  12108 -12109  494 -12110 0
 12107  12108 -12109  494 -12111 0
 12107  12108 -12109  494 -12112 0

c  0-1 --> -1
c    (-b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧ -p_494) -> ( b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0)
c  in CNF:
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨  b^{13, 39}_2
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_1
c     b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨  b^{13, 39}_0
c  in DIMACS:
 12107  12108  12109  494  12110 0
 12107  12108  12109  494 -12111 0
 12107  12108  12109  494  12112 0

c  -1-1 --> -2
c    ( b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧  b^{13, 38}_0 ∧ -p_494) -> ( b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0)
c  in CNF:
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨  b^{13, 39}_2
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨  b^{13, 39}_1
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨  p_494 ∨ -b^{13, 39}_0
c  in DIMACS:
-12107  12108 -12109  494  12110 0
-12107  12108 -12109  494  12111 0
-12107  12108 -12109  494 -12112 0

c  -2-1 --> break 
c    ( b^{13, 38}_2 ∧  b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨  b^{13, 38}_0 ∨  p_494 ∨ break
c  in DIMACS:
-12107 -12108  12109  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 38}_2 ∧ -b^{13, 38}_1 ∧ -b^{13, 38}_0 ∧ true) 
c  in CNF:
c    -b^{13, 38}_2 ∨  b^{13, 38}_1 ∨  b^{13, 38}_0 ∨ false 
c  in DIMACS:
-12107  12108  12109  0

c  3 does not represent an automaton state.
c    -(-b^{13, 38}_2 ∧  b^{13, 38}_1 ∧  b^{13, 38}_0 ∧ true) 
c  in CNF:
c     b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ false 
c  in DIMACS:
 12107 -12108 -12109  0
c  -3 does not represent an automaton state.
c    -( b^{13, 38}_2 ∧  b^{13, 38}_1 ∧  b^{13, 38}_0 ∧ true) 
c  in CNF:
c    -b^{13, 38}_2 ∨ -b^{13, 38}_1 ∨ -b^{13, 38}_0 ∨ false 
c  in DIMACS:
-12107 -12108 -12109  0

c i = 39
c  -2+1 --> -1
c    ( b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧  p_507) -> ( b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0)
c  in CNF:
c    -b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨  b^{13, 40}_2
c    -b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_1
c    -b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨  b^{13, 40}_0
c  in DIMACS:
-12110 -12111  12112 -507  12113 0
-12110 -12111  12112 -507 -12114 0
-12110 -12111  12112 -507  12115 0

c  -1+1 --> 0
c    ( b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0 ∧  p_507) -> (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧ -b^{13, 40}_0)
c  in CNF:
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_2
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_1
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_0
c  in DIMACS:
-12110  12111 -12112 -507 -12113 0
-12110  12111 -12112 -507 -12114 0
-12110  12111 -12112 -507 -12115 0

c  0+1 --> 1
c    (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧  p_507) -> (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0)
c  in CNF:
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_2
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_1
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨  b^{13, 40}_0
c  in DIMACS:
 12110  12111  12112 -507 -12113 0
 12110  12111  12112 -507 -12114 0
 12110  12111  12112 -507  12115 0

c  1+1 --> 2
c    (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0 ∧  p_507) -> (-b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0)
c  in CNF:
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_2
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨  b^{13, 40}_1
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ -p_507 ∨ -b^{13, 40}_0
c  in DIMACS:
 12110  12111 -12112 -507 -12113 0
 12110  12111 -12112 -507  12114 0
 12110  12111 -12112 -507 -12115 0

c  2+1 --> break 
c    (-b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧  p_507) -> break
c  in CNF:
c     b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ -p_507 ∨ break
c  in DIMACS:
 12110 -12111  12112 -507 1162 0


c  2-1 --> 1
c    (-b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧ -p_507) -> (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0)
c  in CNF:
c     b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_2
c     b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_1
c     b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨  b^{13, 40}_0
c  in DIMACS:
 12110 -12111  12112  507 -12113 0
 12110 -12111  12112  507 -12114 0
 12110 -12111  12112  507  12115 0

c  1-1 --> 0
c    (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0 ∧ -p_507) -> (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧ -b^{13, 40}_0)
c  in CNF:
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_2
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_1
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_0
c  in DIMACS:
 12110  12111 -12112  507 -12113 0
 12110  12111 -12112  507 -12114 0
 12110  12111 -12112  507 -12115 0

c  0-1 --> -1
c    (-b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧ -p_507) -> ( b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0)
c  in CNF:
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨  b^{13, 40}_2
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_1
c     b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨  b^{13, 40}_0
c  in DIMACS:
 12110  12111  12112  507  12113 0
 12110  12111  12112  507 -12114 0
 12110  12111  12112  507  12115 0

c  -1-1 --> -2
c    ( b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧  b^{13, 39}_0 ∧ -p_507) -> ( b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0)
c  in CNF:
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨  b^{13, 40}_2
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨  b^{13, 40}_1
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨  p_507 ∨ -b^{13, 40}_0
c  in DIMACS:
-12110  12111 -12112  507  12113 0
-12110  12111 -12112  507  12114 0
-12110  12111 -12112  507 -12115 0

c  -2-1 --> break 
c    ( b^{13, 39}_2 ∧  b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧ -p_507) -> break
c  in CNF:
c    -b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨  b^{13, 39}_0 ∨  p_507 ∨ break
c  in DIMACS:
-12110 -12111  12112  507 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 39}_2 ∧ -b^{13, 39}_1 ∧ -b^{13, 39}_0 ∧ true) 
c  in CNF:
c    -b^{13, 39}_2 ∨  b^{13, 39}_1 ∨  b^{13, 39}_0 ∨ false 
c  in DIMACS:
-12110  12111  12112  0

c  3 does not represent an automaton state.
c    -(-b^{13, 39}_2 ∧  b^{13, 39}_1 ∧  b^{13, 39}_0 ∧ true) 
c  in CNF:
c     b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ false 
c  in DIMACS:
 12110 -12111 -12112  0
c  -3 does not represent an automaton state.
c    -( b^{13, 39}_2 ∧  b^{13, 39}_1 ∧  b^{13, 39}_0 ∧ true) 
c  in CNF:
c    -b^{13, 39}_2 ∨ -b^{13, 39}_1 ∨ -b^{13, 39}_0 ∨ false 
c  in DIMACS:
-12110 -12111 -12112  0

c i = 40
c  -2+1 --> -1
c    ( b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧  p_520) -> ( b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0)
c  in CNF:
c    -b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨  b^{13, 41}_2
c    -b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_1
c    -b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨  b^{13, 41}_0
c  in DIMACS:
-12113 -12114  12115 -520  12116 0
-12113 -12114  12115 -520 -12117 0
-12113 -12114  12115 -520  12118 0

c  -1+1 --> 0
c    ( b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0 ∧  p_520) -> (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧ -b^{13, 41}_0)
c  in CNF:
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_2
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_1
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_0
c  in DIMACS:
-12113  12114 -12115 -520 -12116 0
-12113  12114 -12115 -520 -12117 0
-12113  12114 -12115 -520 -12118 0

c  0+1 --> 1
c    (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧  p_520) -> (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0)
c  in CNF:
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_2
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_1
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨  b^{13, 41}_0
c  in DIMACS:
 12113  12114  12115 -520 -12116 0
 12113  12114  12115 -520 -12117 0
 12113  12114  12115 -520  12118 0

c  1+1 --> 2
c    (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0 ∧  p_520) -> (-b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0)
c  in CNF:
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_2
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨  b^{13, 41}_1
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ -p_520 ∨ -b^{13, 41}_0
c  in DIMACS:
 12113  12114 -12115 -520 -12116 0
 12113  12114 -12115 -520  12117 0
 12113  12114 -12115 -520 -12118 0

c  2+1 --> break 
c    (-b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧  p_520) -> break
c  in CNF:
c     b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 12113 -12114  12115 -520 1162 0


c  2-1 --> 1
c    (-b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧ -p_520) -> (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0)
c  in CNF:
c     b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_2
c     b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_1
c     b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨  b^{13, 41}_0
c  in DIMACS:
 12113 -12114  12115  520 -12116 0
 12113 -12114  12115  520 -12117 0
 12113 -12114  12115  520  12118 0

c  1-1 --> 0
c    (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0 ∧ -p_520) -> (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧ -b^{13, 41}_0)
c  in CNF:
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_2
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_1
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_0
c  in DIMACS:
 12113  12114 -12115  520 -12116 0
 12113  12114 -12115  520 -12117 0
 12113  12114 -12115  520 -12118 0

c  0-1 --> -1
c    (-b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧ -p_520) -> ( b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0)
c  in CNF:
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨  b^{13, 41}_2
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_1
c     b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨  b^{13, 41}_0
c  in DIMACS:
 12113  12114  12115  520  12116 0
 12113  12114  12115  520 -12117 0
 12113  12114  12115  520  12118 0

c  -1-1 --> -2
c    ( b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧  b^{13, 40}_0 ∧ -p_520) -> ( b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0)
c  in CNF:
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨  b^{13, 41}_2
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨  b^{13, 41}_1
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨  p_520 ∨ -b^{13, 41}_0
c  in DIMACS:
-12113  12114 -12115  520  12116 0
-12113  12114 -12115  520  12117 0
-12113  12114 -12115  520 -12118 0

c  -2-1 --> break 
c    ( b^{13, 40}_2 ∧  b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨  b^{13, 40}_0 ∨  p_520 ∨ break
c  in DIMACS:
-12113 -12114  12115  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 40}_2 ∧ -b^{13, 40}_1 ∧ -b^{13, 40}_0 ∧ true) 
c  in CNF:
c    -b^{13, 40}_2 ∨  b^{13, 40}_1 ∨  b^{13, 40}_0 ∨ false 
c  in DIMACS:
-12113  12114  12115  0

c  3 does not represent an automaton state.
c    -(-b^{13, 40}_2 ∧  b^{13, 40}_1 ∧  b^{13, 40}_0 ∧ true) 
c  in CNF:
c     b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ false 
c  in DIMACS:
 12113 -12114 -12115  0
c  -3 does not represent an automaton state.
c    -( b^{13, 40}_2 ∧  b^{13, 40}_1 ∧  b^{13, 40}_0 ∧ true) 
c  in CNF:
c    -b^{13, 40}_2 ∨ -b^{13, 40}_1 ∨ -b^{13, 40}_0 ∨ false 
c  in DIMACS:
-12113 -12114 -12115  0

c i = 41
c  -2+1 --> -1
c    ( b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧  p_533) -> ( b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0)
c  in CNF:
c    -b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨  b^{13, 42}_2
c    -b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_1
c    -b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨  b^{13, 42}_0
c  in DIMACS:
-12116 -12117  12118 -533  12119 0
-12116 -12117  12118 -533 -12120 0
-12116 -12117  12118 -533  12121 0

c  -1+1 --> 0
c    ( b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0 ∧  p_533) -> (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧ -b^{13, 42}_0)
c  in CNF:
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_2
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_1
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_0
c  in DIMACS:
-12116  12117 -12118 -533 -12119 0
-12116  12117 -12118 -533 -12120 0
-12116  12117 -12118 -533 -12121 0

c  0+1 --> 1
c    (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧  p_533) -> (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0)
c  in CNF:
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_2
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_1
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨  b^{13, 42}_0
c  in DIMACS:
 12116  12117  12118 -533 -12119 0
 12116  12117  12118 -533 -12120 0
 12116  12117  12118 -533  12121 0

c  1+1 --> 2
c    (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0 ∧  p_533) -> (-b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0)
c  in CNF:
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_2
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨  b^{13, 42}_1
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ -p_533 ∨ -b^{13, 42}_0
c  in DIMACS:
 12116  12117 -12118 -533 -12119 0
 12116  12117 -12118 -533  12120 0
 12116  12117 -12118 -533 -12121 0

c  2+1 --> break 
c    (-b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧  p_533) -> break
c  in CNF:
c     b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ -p_533 ∨ break
c  in DIMACS:
 12116 -12117  12118 -533 1162 0


c  2-1 --> 1
c    (-b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧ -p_533) -> (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0)
c  in CNF:
c     b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_2
c     b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_1
c     b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨  b^{13, 42}_0
c  in DIMACS:
 12116 -12117  12118  533 -12119 0
 12116 -12117  12118  533 -12120 0
 12116 -12117  12118  533  12121 0

c  1-1 --> 0
c    (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0 ∧ -p_533) -> (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧ -b^{13, 42}_0)
c  in CNF:
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_2
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_1
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_0
c  in DIMACS:
 12116  12117 -12118  533 -12119 0
 12116  12117 -12118  533 -12120 0
 12116  12117 -12118  533 -12121 0

c  0-1 --> -1
c    (-b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧ -p_533) -> ( b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0)
c  in CNF:
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨  b^{13, 42}_2
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_1
c     b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨  b^{13, 42}_0
c  in DIMACS:
 12116  12117  12118  533  12119 0
 12116  12117  12118  533 -12120 0
 12116  12117  12118  533  12121 0

c  -1-1 --> -2
c    ( b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧  b^{13, 41}_0 ∧ -p_533) -> ( b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0)
c  in CNF:
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨  b^{13, 42}_2
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨  b^{13, 42}_1
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨  p_533 ∨ -b^{13, 42}_0
c  in DIMACS:
-12116  12117 -12118  533  12119 0
-12116  12117 -12118  533  12120 0
-12116  12117 -12118  533 -12121 0

c  -2-1 --> break 
c    ( b^{13, 41}_2 ∧  b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧ -p_533) -> break
c  in CNF:
c    -b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨  b^{13, 41}_0 ∨  p_533 ∨ break
c  in DIMACS:
-12116 -12117  12118  533 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 41}_2 ∧ -b^{13, 41}_1 ∧ -b^{13, 41}_0 ∧ true) 
c  in CNF:
c    -b^{13, 41}_2 ∨  b^{13, 41}_1 ∨  b^{13, 41}_0 ∨ false 
c  in DIMACS:
-12116  12117  12118  0

c  3 does not represent an automaton state.
c    -(-b^{13, 41}_2 ∧  b^{13, 41}_1 ∧  b^{13, 41}_0 ∧ true) 
c  in CNF:
c     b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ false 
c  in DIMACS:
 12116 -12117 -12118  0
c  -3 does not represent an automaton state.
c    -( b^{13, 41}_2 ∧  b^{13, 41}_1 ∧  b^{13, 41}_0 ∧ true) 
c  in CNF:
c    -b^{13, 41}_2 ∨ -b^{13, 41}_1 ∨ -b^{13, 41}_0 ∨ false 
c  in DIMACS:
-12116 -12117 -12118  0

c i = 42
c  -2+1 --> -1
c    ( b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧  p_546) -> ( b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0)
c  in CNF:
c    -b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨  b^{13, 43}_2
c    -b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_1
c    -b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨  b^{13, 43}_0
c  in DIMACS:
-12119 -12120  12121 -546  12122 0
-12119 -12120  12121 -546 -12123 0
-12119 -12120  12121 -546  12124 0

c  -1+1 --> 0
c    ( b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0 ∧  p_546) -> (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧ -b^{13, 43}_0)
c  in CNF:
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_2
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_1
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_0
c  in DIMACS:
-12119  12120 -12121 -546 -12122 0
-12119  12120 -12121 -546 -12123 0
-12119  12120 -12121 -546 -12124 0

c  0+1 --> 1
c    (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧  p_546) -> (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0)
c  in CNF:
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_2
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_1
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨  b^{13, 43}_0
c  in DIMACS:
 12119  12120  12121 -546 -12122 0
 12119  12120  12121 -546 -12123 0
 12119  12120  12121 -546  12124 0

c  1+1 --> 2
c    (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0 ∧  p_546) -> (-b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0)
c  in CNF:
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_2
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨  b^{13, 43}_1
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ -p_546 ∨ -b^{13, 43}_0
c  in DIMACS:
 12119  12120 -12121 -546 -12122 0
 12119  12120 -12121 -546  12123 0
 12119  12120 -12121 -546 -12124 0

c  2+1 --> break 
c    (-b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧  p_546) -> break
c  in CNF:
c     b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 12119 -12120  12121 -546 1162 0


c  2-1 --> 1
c    (-b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧ -p_546) -> (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0)
c  in CNF:
c     b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_2
c     b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_1
c     b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨  b^{13, 43}_0
c  in DIMACS:
 12119 -12120  12121  546 -12122 0
 12119 -12120  12121  546 -12123 0
 12119 -12120  12121  546  12124 0

c  1-1 --> 0
c    (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0 ∧ -p_546) -> (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧ -b^{13, 43}_0)
c  in CNF:
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_2
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_1
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_0
c  in DIMACS:
 12119  12120 -12121  546 -12122 0
 12119  12120 -12121  546 -12123 0
 12119  12120 -12121  546 -12124 0

c  0-1 --> -1
c    (-b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧ -p_546) -> ( b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0)
c  in CNF:
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨  b^{13, 43}_2
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_1
c     b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨  b^{13, 43}_0
c  in DIMACS:
 12119  12120  12121  546  12122 0
 12119  12120  12121  546 -12123 0
 12119  12120  12121  546  12124 0

c  -1-1 --> -2
c    ( b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧  b^{13, 42}_0 ∧ -p_546) -> ( b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0)
c  in CNF:
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨  b^{13, 43}_2
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨  b^{13, 43}_1
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨  p_546 ∨ -b^{13, 43}_0
c  in DIMACS:
-12119  12120 -12121  546  12122 0
-12119  12120 -12121  546  12123 0
-12119  12120 -12121  546 -12124 0

c  -2-1 --> break 
c    ( b^{13, 42}_2 ∧  b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨  b^{13, 42}_0 ∨  p_546 ∨ break
c  in DIMACS:
-12119 -12120  12121  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 42}_2 ∧ -b^{13, 42}_1 ∧ -b^{13, 42}_0 ∧ true) 
c  in CNF:
c    -b^{13, 42}_2 ∨  b^{13, 42}_1 ∨  b^{13, 42}_0 ∨ false 
c  in DIMACS:
-12119  12120  12121  0

c  3 does not represent an automaton state.
c    -(-b^{13, 42}_2 ∧  b^{13, 42}_1 ∧  b^{13, 42}_0 ∧ true) 
c  in CNF:
c     b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ false 
c  in DIMACS:
 12119 -12120 -12121  0
c  -3 does not represent an automaton state.
c    -( b^{13, 42}_2 ∧  b^{13, 42}_1 ∧  b^{13, 42}_0 ∧ true) 
c  in CNF:
c    -b^{13, 42}_2 ∨ -b^{13, 42}_1 ∨ -b^{13, 42}_0 ∨ false 
c  in DIMACS:
-12119 -12120 -12121  0

c i = 43
c  -2+1 --> -1
c    ( b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧  p_559) -> ( b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0)
c  in CNF:
c    -b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨  b^{13, 44}_2
c    -b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_1
c    -b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨  b^{13, 44}_0
c  in DIMACS:
-12122 -12123  12124 -559  12125 0
-12122 -12123  12124 -559 -12126 0
-12122 -12123  12124 -559  12127 0

c  -1+1 --> 0
c    ( b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0 ∧  p_559) -> (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧ -b^{13, 44}_0)
c  in CNF:
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_2
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_1
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_0
c  in DIMACS:
-12122  12123 -12124 -559 -12125 0
-12122  12123 -12124 -559 -12126 0
-12122  12123 -12124 -559 -12127 0

c  0+1 --> 1
c    (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧  p_559) -> (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0)
c  in CNF:
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_2
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_1
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨  b^{13, 44}_0
c  in DIMACS:
 12122  12123  12124 -559 -12125 0
 12122  12123  12124 -559 -12126 0
 12122  12123  12124 -559  12127 0

c  1+1 --> 2
c    (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0 ∧  p_559) -> (-b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0)
c  in CNF:
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_2
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨  b^{13, 44}_1
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ -p_559 ∨ -b^{13, 44}_0
c  in DIMACS:
 12122  12123 -12124 -559 -12125 0
 12122  12123 -12124 -559  12126 0
 12122  12123 -12124 -559 -12127 0

c  2+1 --> break 
c    (-b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧  p_559) -> break
c  in CNF:
c     b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ -p_559 ∨ break
c  in DIMACS:
 12122 -12123  12124 -559 1162 0


c  2-1 --> 1
c    (-b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧ -p_559) -> (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0)
c  in CNF:
c     b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_2
c     b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_1
c     b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨  b^{13, 44}_0
c  in DIMACS:
 12122 -12123  12124  559 -12125 0
 12122 -12123  12124  559 -12126 0
 12122 -12123  12124  559  12127 0

c  1-1 --> 0
c    (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0 ∧ -p_559) -> (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧ -b^{13, 44}_0)
c  in CNF:
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_2
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_1
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_0
c  in DIMACS:
 12122  12123 -12124  559 -12125 0
 12122  12123 -12124  559 -12126 0
 12122  12123 -12124  559 -12127 0

c  0-1 --> -1
c    (-b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧ -p_559) -> ( b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0)
c  in CNF:
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨  b^{13, 44}_2
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_1
c     b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨  b^{13, 44}_0
c  in DIMACS:
 12122  12123  12124  559  12125 0
 12122  12123  12124  559 -12126 0
 12122  12123  12124  559  12127 0

c  -1-1 --> -2
c    ( b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧  b^{13, 43}_0 ∧ -p_559) -> ( b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0)
c  in CNF:
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨  b^{13, 44}_2
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨  b^{13, 44}_1
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨  p_559 ∨ -b^{13, 44}_0
c  in DIMACS:
-12122  12123 -12124  559  12125 0
-12122  12123 -12124  559  12126 0
-12122  12123 -12124  559 -12127 0

c  -2-1 --> break 
c    ( b^{13, 43}_2 ∧  b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧ -p_559) -> break
c  in CNF:
c    -b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨  b^{13, 43}_0 ∨  p_559 ∨ break
c  in DIMACS:
-12122 -12123  12124  559 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 43}_2 ∧ -b^{13, 43}_1 ∧ -b^{13, 43}_0 ∧ true) 
c  in CNF:
c    -b^{13, 43}_2 ∨  b^{13, 43}_1 ∨  b^{13, 43}_0 ∨ false 
c  in DIMACS:
-12122  12123  12124  0

c  3 does not represent an automaton state.
c    -(-b^{13, 43}_2 ∧  b^{13, 43}_1 ∧  b^{13, 43}_0 ∧ true) 
c  in CNF:
c     b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ false 
c  in DIMACS:
 12122 -12123 -12124  0
c  -3 does not represent an automaton state.
c    -( b^{13, 43}_2 ∧  b^{13, 43}_1 ∧  b^{13, 43}_0 ∧ true) 
c  in CNF:
c    -b^{13, 43}_2 ∨ -b^{13, 43}_1 ∨ -b^{13, 43}_0 ∨ false 
c  in DIMACS:
-12122 -12123 -12124  0

c i = 44
c  -2+1 --> -1
c    ( b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧  p_572) -> ( b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0)
c  in CNF:
c    -b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨  b^{13, 45}_2
c    -b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_1
c    -b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨  b^{13, 45}_0
c  in DIMACS:
-12125 -12126  12127 -572  12128 0
-12125 -12126  12127 -572 -12129 0
-12125 -12126  12127 -572  12130 0

c  -1+1 --> 0
c    ( b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0 ∧  p_572) -> (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧ -b^{13, 45}_0)
c  in CNF:
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_2
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_1
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_0
c  in DIMACS:
-12125  12126 -12127 -572 -12128 0
-12125  12126 -12127 -572 -12129 0
-12125  12126 -12127 -572 -12130 0

c  0+1 --> 1
c    (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧  p_572) -> (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0)
c  in CNF:
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_2
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_1
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨  b^{13, 45}_0
c  in DIMACS:
 12125  12126  12127 -572 -12128 0
 12125  12126  12127 -572 -12129 0
 12125  12126  12127 -572  12130 0

c  1+1 --> 2
c    (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0 ∧  p_572) -> (-b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0)
c  in CNF:
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_2
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨  b^{13, 45}_1
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ -p_572 ∨ -b^{13, 45}_0
c  in DIMACS:
 12125  12126 -12127 -572 -12128 0
 12125  12126 -12127 -572  12129 0
 12125  12126 -12127 -572 -12130 0

c  2+1 --> break 
c    (-b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧  p_572) -> break
c  in CNF:
c     b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 12125 -12126  12127 -572 1162 0


c  2-1 --> 1
c    (-b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧ -p_572) -> (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0)
c  in CNF:
c     b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_2
c     b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_1
c     b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨  b^{13, 45}_0
c  in DIMACS:
 12125 -12126  12127  572 -12128 0
 12125 -12126  12127  572 -12129 0
 12125 -12126  12127  572  12130 0

c  1-1 --> 0
c    (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0 ∧ -p_572) -> (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧ -b^{13, 45}_0)
c  in CNF:
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_2
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_1
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_0
c  in DIMACS:
 12125  12126 -12127  572 -12128 0
 12125  12126 -12127  572 -12129 0
 12125  12126 -12127  572 -12130 0

c  0-1 --> -1
c    (-b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧ -p_572) -> ( b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0)
c  in CNF:
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨  b^{13, 45}_2
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_1
c     b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨  b^{13, 45}_0
c  in DIMACS:
 12125  12126  12127  572  12128 0
 12125  12126  12127  572 -12129 0
 12125  12126  12127  572  12130 0

c  -1-1 --> -2
c    ( b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧  b^{13, 44}_0 ∧ -p_572) -> ( b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0)
c  in CNF:
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨  b^{13, 45}_2
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨  b^{13, 45}_1
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨  p_572 ∨ -b^{13, 45}_0
c  in DIMACS:
-12125  12126 -12127  572  12128 0
-12125  12126 -12127  572  12129 0
-12125  12126 -12127  572 -12130 0

c  -2-1 --> break 
c    ( b^{13, 44}_2 ∧  b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨  b^{13, 44}_0 ∨  p_572 ∨ break
c  in DIMACS:
-12125 -12126  12127  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 44}_2 ∧ -b^{13, 44}_1 ∧ -b^{13, 44}_0 ∧ true) 
c  in CNF:
c    -b^{13, 44}_2 ∨  b^{13, 44}_1 ∨  b^{13, 44}_0 ∨ false 
c  in DIMACS:
-12125  12126  12127  0

c  3 does not represent an automaton state.
c    -(-b^{13, 44}_2 ∧  b^{13, 44}_1 ∧  b^{13, 44}_0 ∧ true) 
c  in CNF:
c     b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ false 
c  in DIMACS:
 12125 -12126 -12127  0
c  -3 does not represent an automaton state.
c    -( b^{13, 44}_2 ∧  b^{13, 44}_1 ∧  b^{13, 44}_0 ∧ true) 
c  in CNF:
c    -b^{13, 44}_2 ∨ -b^{13, 44}_1 ∨ -b^{13, 44}_0 ∨ false 
c  in DIMACS:
-12125 -12126 -12127  0

c i = 45
c  -2+1 --> -1
c    ( b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧  p_585) -> ( b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0)
c  in CNF:
c    -b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨  b^{13, 46}_2
c    -b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_1
c    -b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨  b^{13, 46}_0
c  in DIMACS:
-12128 -12129  12130 -585  12131 0
-12128 -12129  12130 -585 -12132 0
-12128 -12129  12130 -585  12133 0

c  -1+1 --> 0
c    ( b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0 ∧  p_585) -> (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧ -b^{13, 46}_0)
c  in CNF:
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_2
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_1
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_0
c  in DIMACS:
-12128  12129 -12130 -585 -12131 0
-12128  12129 -12130 -585 -12132 0
-12128  12129 -12130 -585 -12133 0

c  0+1 --> 1
c    (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧  p_585) -> (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0)
c  in CNF:
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_2
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_1
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨  b^{13, 46}_0
c  in DIMACS:
 12128  12129  12130 -585 -12131 0
 12128  12129  12130 -585 -12132 0
 12128  12129  12130 -585  12133 0

c  1+1 --> 2
c    (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0 ∧  p_585) -> (-b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0)
c  in CNF:
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_2
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨  b^{13, 46}_1
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ -p_585 ∨ -b^{13, 46}_0
c  in DIMACS:
 12128  12129 -12130 -585 -12131 0
 12128  12129 -12130 -585  12132 0
 12128  12129 -12130 -585 -12133 0

c  2+1 --> break 
c    (-b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧  p_585) -> break
c  in CNF:
c     b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 12128 -12129  12130 -585 1162 0


c  2-1 --> 1
c    (-b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧ -p_585) -> (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0)
c  in CNF:
c     b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_2
c     b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_1
c     b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨  b^{13, 46}_0
c  in DIMACS:
 12128 -12129  12130  585 -12131 0
 12128 -12129  12130  585 -12132 0
 12128 -12129  12130  585  12133 0

c  1-1 --> 0
c    (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0 ∧ -p_585) -> (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧ -b^{13, 46}_0)
c  in CNF:
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_2
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_1
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_0
c  in DIMACS:
 12128  12129 -12130  585 -12131 0
 12128  12129 -12130  585 -12132 0
 12128  12129 -12130  585 -12133 0

c  0-1 --> -1
c    (-b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧ -p_585) -> ( b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0)
c  in CNF:
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨  b^{13, 46}_2
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_1
c     b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨  b^{13, 46}_0
c  in DIMACS:
 12128  12129  12130  585  12131 0
 12128  12129  12130  585 -12132 0
 12128  12129  12130  585  12133 0

c  -1-1 --> -2
c    ( b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧  b^{13, 45}_0 ∧ -p_585) -> ( b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0)
c  in CNF:
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨  b^{13, 46}_2
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨  b^{13, 46}_1
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨  p_585 ∨ -b^{13, 46}_0
c  in DIMACS:
-12128  12129 -12130  585  12131 0
-12128  12129 -12130  585  12132 0
-12128  12129 -12130  585 -12133 0

c  -2-1 --> break 
c    ( b^{13, 45}_2 ∧  b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨  b^{13, 45}_0 ∨  p_585 ∨ break
c  in DIMACS:
-12128 -12129  12130  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 45}_2 ∧ -b^{13, 45}_1 ∧ -b^{13, 45}_0 ∧ true) 
c  in CNF:
c    -b^{13, 45}_2 ∨  b^{13, 45}_1 ∨  b^{13, 45}_0 ∨ false 
c  in DIMACS:
-12128  12129  12130  0

c  3 does not represent an automaton state.
c    -(-b^{13, 45}_2 ∧  b^{13, 45}_1 ∧  b^{13, 45}_0 ∧ true) 
c  in CNF:
c     b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ false 
c  in DIMACS:
 12128 -12129 -12130  0
c  -3 does not represent an automaton state.
c    -( b^{13, 45}_2 ∧  b^{13, 45}_1 ∧  b^{13, 45}_0 ∧ true) 
c  in CNF:
c    -b^{13, 45}_2 ∨ -b^{13, 45}_1 ∨ -b^{13, 45}_0 ∨ false 
c  in DIMACS:
-12128 -12129 -12130  0

c i = 46
c  -2+1 --> -1
c    ( b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧  p_598) -> ( b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0)
c  in CNF:
c    -b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨  b^{13, 47}_2
c    -b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_1
c    -b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨  b^{13, 47}_0
c  in DIMACS:
-12131 -12132  12133 -598  12134 0
-12131 -12132  12133 -598 -12135 0
-12131 -12132  12133 -598  12136 0

c  -1+1 --> 0
c    ( b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0 ∧  p_598) -> (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧ -b^{13, 47}_0)
c  in CNF:
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_2
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_1
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_0
c  in DIMACS:
-12131  12132 -12133 -598 -12134 0
-12131  12132 -12133 -598 -12135 0
-12131  12132 -12133 -598 -12136 0

c  0+1 --> 1
c    (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧  p_598) -> (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0)
c  in CNF:
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_2
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_1
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨  b^{13, 47}_0
c  in DIMACS:
 12131  12132  12133 -598 -12134 0
 12131  12132  12133 -598 -12135 0
 12131  12132  12133 -598  12136 0

c  1+1 --> 2
c    (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0 ∧  p_598) -> (-b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0)
c  in CNF:
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_2
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨  b^{13, 47}_1
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ -p_598 ∨ -b^{13, 47}_0
c  in DIMACS:
 12131  12132 -12133 -598 -12134 0
 12131  12132 -12133 -598  12135 0
 12131  12132 -12133 -598 -12136 0

c  2+1 --> break 
c    (-b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧  p_598) -> break
c  in CNF:
c     b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 12131 -12132  12133 -598 1162 0


c  2-1 --> 1
c    (-b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧ -p_598) -> (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0)
c  in CNF:
c     b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_2
c     b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_1
c     b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨  b^{13, 47}_0
c  in DIMACS:
 12131 -12132  12133  598 -12134 0
 12131 -12132  12133  598 -12135 0
 12131 -12132  12133  598  12136 0

c  1-1 --> 0
c    (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0 ∧ -p_598) -> (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧ -b^{13, 47}_0)
c  in CNF:
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_2
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_1
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_0
c  in DIMACS:
 12131  12132 -12133  598 -12134 0
 12131  12132 -12133  598 -12135 0
 12131  12132 -12133  598 -12136 0

c  0-1 --> -1
c    (-b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧ -p_598) -> ( b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0)
c  in CNF:
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨  b^{13, 47}_2
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_1
c     b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨  b^{13, 47}_0
c  in DIMACS:
 12131  12132  12133  598  12134 0
 12131  12132  12133  598 -12135 0
 12131  12132  12133  598  12136 0

c  -1-1 --> -2
c    ( b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧  b^{13, 46}_0 ∧ -p_598) -> ( b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0)
c  in CNF:
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨  b^{13, 47}_2
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨  b^{13, 47}_1
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨  p_598 ∨ -b^{13, 47}_0
c  in DIMACS:
-12131  12132 -12133  598  12134 0
-12131  12132 -12133  598  12135 0
-12131  12132 -12133  598 -12136 0

c  -2-1 --> break 
c    ( b^{13, 46}_2 ∧  b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨  b^{13, 46}_0 ∨  p_598 ∨ break
c  in DIMACS:
-12131 -12132  12133  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 46}_2 ∧ -b^{13, 46}_1 ∧ -b^{13, 46}_0 ∧ true) 
c  in CNF:
c    -b^{13, 46}_2 ∨  b^{13, 46}_1 ∨  b^{13, 46}_0 ∨ false 
c  in DIMACS:
-12131  12132  12133  0

c  3 does not represent an automaton state.
c    -(-b^{13, 46}_2 ∧  b^{13, 46}_1 ∧  b^{13, 46}_0 ∧ true) 
c  in CNF:
c     b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ false 
c  in DIMACS:
 12131 -12132 -12133  0
c  -3 does not represent an automaton state.
c    -( b^{13, 46}_2 ∧  b^{13, 46}_1 ∧  b^{13, 46}_0 ∧ true) 
c  in CNF:
c    -b^{13, 46}_2 ∨ -b^{13, 46}_1 ∨ -b^{13, 46}_0 ∨ false 
c  in DIMACS:
-12131 -12132 -12133  0

c i = 47
c  -2+1 --> -1
c    ( b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧  p_611) -> ( b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0)
c  in CNF:
c    -b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨  b^{13, 48}_2
c    -b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_1
c    -b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨  b^{13, 48}_0
c  in DIMACS:
-12134 -12135  12136 -611  12137 0
-12134 -12135  12136 -611 -12138 0
-12134 -12135  12136 -611  12139 0

c  -1+1 --> 0
c    ( b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0 ∧  p_611) -> (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧ -b^{13, 48}_0)
c  in CNF:
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_2
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_1
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_0
c  in DIMACS:
-12134  12135 -12136 -611 -12137 0
-12134  12135 -12136 -611 -12138 0
-12134  12135 -12136 -611 -12139 0

c  0+1 --> 1
c    (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧  p_611) -> (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0)
c  in CNF:
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_2
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_1
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨  b^{13, 48}_0
c  in DIMACS:
 12134  12135  12136 -611 -12137 0
 12134  12135  12136 -611 -12138 0
 12134  12135  12136 -611  12139 0

c  1+1 --> 2
c    (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0 ∧  p_611) -> (-b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0)
c  in CNF:
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_2
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨  b^{13, 48}_1
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ -p_611 ∨ -b^{13, 48}_0
c  in DIMACS:
 12134  12135 -12136 -611 -12137 0
 12134  12135 -12136 -611  12138 0
 12134  12135 -12136 -611 -12139 0

c  2+1 --> break 
c    (-b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧  p_611) -> break
c  in CNF:
c     b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ -p_611 ∨ break
c  in DIMACS:
 12134 -12135  12136 -611 1162 0


c  2-1 --> 1
c    (-b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧ -p_611) -> (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0)
c  in CNF:
c     b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_2
c     b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_1
c     b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨  b^{13, 48}_0
c  in DIMACS:
 12134 -12135  12136  611 -12137 0
 12134 -12135  12136  611 -12138 0
 12134 -12135  12136  611  12139 0

c  1-1 --> 0
c    (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0 ∧ -p_611) -> (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧ -b^{13, 48}_0)
c  in CNF:
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_2
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_1
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_0
c  in DIMACS:
 12134  12135 -12136  611 -12137 0
 12134  12135 -12136  611 -12138 0
 12134  12135 -12136  611 -12139 0

c  0-1 --> -1
c    (-b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧ -p_611) -> ( b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0)
c  in CNF:
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨  b^{13, 48}_2
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_1
c     b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨  b^{13, 48}_0
c  in DIMACS:
 12134  12135  12136  611  12137 0
 12134  12135  12136  611 -12138 0
 12134  12135  12136  611  12139 0

c  -1-1 --> -2
c    ( b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧  b^{13, 47}_0 ∧ -p_611) -> ( b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0)
c  in CNF:
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨  b^{13, 48}_2
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨  b^{13, 48}_1
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨  p_611 ∨ -b^{13, 48}_0
c  in DIMACS:
-12134  12135 -12136  611  12137 0
-12134  12135 -12136  611  12138 0
-12134  12135 -12136  611 -12139 0

c  -2-1 --> break 
c    ( b^{13, 47}_2 ∧  b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧ -p_611) -> break
c  in CNF:
c    -b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨  b^{13, 47}_0 ∨  p_611 ∨ break
c  in DIMACS:
-12134 -12135  12136  611 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 47}_2 ∧ -b^{13, 47}_1 ∧ -b^{13, 47}_0 ∧ true) 
c  in CNF:
c    -b^{13, 47}_2 ∨  b^{13, 47}_1 ∨  b^{13, 47}_0 ∨ false 
c  in DIMACS:
-12134  12135  12136  0

c  3 does not represent an automaton state.
c    -(-b^{13, 47}_2 ∧  b^{13, 47}_1 ∧  b^{13, 47}_0 ∧ true) 
c  in CNF:
c     b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ false 
c  in DIMACS:
 12134 -12135 -12136  0
c  -3 does not represent an automaton state.
c    -( b^{13, 47}_2 ∧  b^{13, 47}_1 ∧  b^{13, 47}_0 ∧ true) 
c  in CNF:
c    -b^{13, 47}_2 ∨ -b^{13, 47}_1 ∨ -b^{13, 47}_0 ∨ false 
c  in DIMACS:
-12134 -12135 -12136  0

c i = 48
c  -2+1 --> -1
c    ( b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧  p_624) -> ( b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0)
c  in CNF:
c    -b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨  b^{13, 49}_2
c    -b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_1
c    -b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨  b^{13, 49}_0
c  in DIMACS:
-12137 -12138  12139 -624  12140 0
-12137 -12138  12139 -624 -12141 0
-12137 -12138  12139 -624  12142 0

c  -1+1 --> 0
c    ( b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0 ∧  p_624) -> (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧ -b^{13, 49}_0)
c  in CNF:
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_2
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_1
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_0
c  in DIMACS:
-12137  12138 -12139 -624 -12140 0
-12137  12138 -12139 -624 -12141 0
-12137  12138 -12139 -624 -12142 0

c  0+1 --> 1
c    (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧  p_624) -> (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0)
c  in CNF:
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_2
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_1
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨  b^{13, 49}_0
c  in DIMACS:
 12137  12138  12139 -624 -12140 0
 12137  12138  12139 -624 -12141 0
 12137  12138  12139 -624  12142 0

c  1+1 --> 2
c    (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0 ∧  p_624) -> (-b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0)
c  in CNF:
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_2
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨  b^{13, 49}_1
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ -p_624 ∨ -b^{13, 49}_0
c  in DIMACS:
 12137  12138 -12139 -624 -12140 0
 12137  12138 -12139 -624  12141 0
 12137  12138 -12139 -624 -12142 0

c  2+1 --> break 
c    (-b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧  p_624) -> break
c  in CNF:
c     b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 12137 -12138  12139 -624 1162 0


c  2-1 --> 1
c    (-b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧ -p_624) -> (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0)
c  in CNF:
c     b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_2
c     b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_1
c     b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨  b^{13, 49}_0
c  in DIMACS:
 12137 -12138  12139  624 -12140 0
 12137 -12138  12139  624 -12141 0
 12137 -12138  12139  624  12142 0

c  1-1 --> 0
c    (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0 ∧ -p_624) -> (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧ -b^{13, 49}_0)
c  in CNF:
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_2
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_1
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_0
c  in DIMACS:
 12137  12138 -12139  624 -12140 0
 12137  12138 -12139  624 -12141 0
 12137  12138 -12139  624 -12142 0

c  0-1 --> -1
c    (-b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧ -p_624) -> ( b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0)
c  in CNF:
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨  b^{13, 49}_2
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_1
c     b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨  b^{13, 49}_0
c  in DIMACS:
 12137  12138  12139  624  12140 0
 12137  12138  12139  624 -12141 0
 12137  12138  12139  624  12142 0

c  -1-1 --> -2
c    ( b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧  b^{13, 48}_0 ∧ -p_624) -> ( b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0)
c  in CNF:
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨  b^{13, 49}_2
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨  b^{13, 49}_1
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨  p_624 ∨ -b^{13, 49}_0
c  in DIMACS:
-12137  12138 -12139  624  12140 0
-12137  12138 -12139  624  12141 0
-12137  12138 -12139  624 -12142 0

c  -2-1 --> break 
c    ( b^{13, 48}_2 ∧  b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨  b^{13, 48}_0 ∨  p_624 ∨ break
c  in DIMACS:
-12137 -12138  12139  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 48}_2 ∧ -b^{13, 48}_1 ∧ -b^{13, 48}_0 ∧ true) 
c  in CNF:
c    -b^{13, 48}_2 ∨  b^{13, 48}_1 ∨  b^{13, 48}_0 ∨ false 
c  in DIMACS:
-12137  12138  12139  0

c  3 does not represent an automaton state.
c    -(-b^{13, 48}_2 ∧  b^{13, 48}_1 ∧  b^{13, 48}_0 ∧ true) 
c  in CNF:
c     b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ false 
c  in DIMACS:
 12137 -12138 -12139  0
c  -3 does not represent an automaton state.
c    -( b^{13, 48}_2 ∧  b^{13, 48}_1 ∧  b^{13, 48}_0 ∧ true) 
c  in CNF:
c    -b^{13, 48}_2 ∨ -b^{13, 48}_1 ∨ -b^{13, 48}_0 ∨ false 
c  in DIMACS:
-12137 -12138 -12139  0

c i = 49
c  -2+1 --> -1
c    ( b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧  p_637) -> ( b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0)
c  in CNF:
c    -b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨  b^{13, 50}_2
c    -b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_1
c    -b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨  b^{13, 50}_0
c  in DIMACS:
-12140 -12141  12142 -637  12143 0
-12140 -12141  12142 -637 -12144 0
-12140 -12141  12142 -637  12145 0

c  -1+1 --> 0
c    ( b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0 ∧  p_637) -> (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧ -b^{13, 50}_0)
c  in CNF:
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_2
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_1
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_0
c  in DIMACS:
-12140  12141 -12142 -637 -12143 0
-12140  12141 -12142 -637 -12144 0
-12140  12141 -12142 -637 -12145 0

c  0+1 --> 1
c    (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧  p_637) -> (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0)
c  in CNF:
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_2
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_1
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨  b^{13, 50}_0
c  in DIMACS:
 12140  12141  12142 -637 -12143 0
 12140  12141  12142 -637 -12144 0
 12140  12141  12142 -637  12145 0

c  1+1 --> 2
c    (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0 ∧  p_637) -> (-b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0)
c  in CNF:
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_2
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨  b^{13, 50}_1
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ -p_637 ∨ -b^{13, 50}_0
c  in DIMACS:
 12140  12141 -12142 -637 -12143 0
 12140  12141 -12142 -637  12144 0
 12140  12141 -12142 -637 -12145 0

c  2+1 --> break 
c    (-b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧  p_637) -> break
c  in CNF:
c     b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ -p_637 ∨ break
c  in DIMACS:
 12140 -12141  12142 -637 1162 0


c  2-1 --> 1
c    (-b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧ -p_637) -> (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0)
c  in CNF:
c     b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_2
c     b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_1
c     b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨  b^{13, 50}_0
c  in DIMACS:
 12140 -12141  12142  637 -12143 0
 12140 -12141  12142  637 -12144 0
 12140 -12141  12142  637  12145 0

c  1-1 --> 0
c    (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0 ∧ -p_637) -> (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧ -b^{13, 50}_0)
c  in CNF:
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_2
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_1
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_0
c  in DIMACS:
 12140  12141 -12142  637 -12143 0
 12140  12141 -12142  637 -12144 0
 12140  12141 -12142  637 -12145 0

c  0-1 --> -1
c    (-b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧ -p_637) -> ( b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0)
c  in CNF:
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨  b^{13, 50}_2
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_1
c     b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨  b^{13, 50}_0
c  in DIMACS:
 12140  12141  12142  637  12143 0
 12140  12141  12142  637 -12144 0
 12140  12141  12142  637  12145 0

c  -1-1 --> -2
c    ( b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧  b^{13, 49}_0 ∧ -p_637) -> ( b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0)
c  in CNF:
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨  b^{13, 50}_2
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨  b^{13, 50}_1
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨  p_637 ∨ -b^{13, 50}_0
c  in DIMACS:
-12140  12141 -12142  637  12143 0
-12140  12141 -12142  637  12144 0
-12140  12141 -12142  637 -12145 0

c  -2-1 --> break 
c    ( b^{13, 49}_2 ∧  b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧ -p_637) -> break
c  in CNF:
c    -b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨  b^{13, 49}_0 ∨  p_637 ∨ break
c  in DIMACS:
-12140 -12141  12142  637 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 49}_2 ∧ -b^{13, 49}_1 ∧ -b^{13, 49}_0 ∧ true) 
c  in CNF:
c    -b^{13, 49}_2 ∨  b^{13, 49}_1 ∨  b^{13, 49}_0 ∨ false 
c  in DIMACS:
-12140  12141  12142  0

c  3 does not represent an automaton state.
c    -(-b^{13, 49}_2 ∧  b^{13, 49}_1 ∧  b^{13, 49}_0 ∧ true) 
c  in CNF:
c     b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ false 
c  in DIMACS:
 12140 -12141 -12142  0
c  -3 does not represent an automaton state.
c    -( b^{13, 49}_2 ∧  b^{13, 49}_1 ∧  b^{13, 49}_0 ∧ true) 
c  in CNF:
c    -b^{13, 49}_2 ∨ -b^{13, 49}_1 ∨ -b^{13, 49}_0 ∨ false 
c  in DIMACS:
-12140 -12141 -12142  0

c i = 50
c  -2+1 --> -1
c    ( b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧  p_650) -> ( b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0)
c  in CNF:
c    -b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨  b^{13, 51}_2
c    -b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_1
c    -b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨  b^{13, 51}_0
c  in DIMACS:
-12143 -12144  12145 -650  12146 0
-12143 -12144  12145 -650 -12147 0
-12143 -12144  12145 -650  12148 0

c  -1+1 --> 0
c    ( b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0 ∧  p_650) -> (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧ -b^{13, 51}_0)
c  in CNF:
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_2
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_1
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_0
c  in DIMACS:
-12143  12144 -12145 -650 -12146 0
-12143  12144 -12145 -650 -12147 0
-12143  12144 -12145 -650 -12148 0

c  0+1 --> 1
c    (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧  p_650) -> (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0)
c  in CNF:
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_2
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_1
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨  b^{13, 51}_0
c  in DIMACS:
 12143  12144  12145 -650 -12146 0
 12143  12144  12145 -650 -12147 0
 12143  12144  12145 -650  12148 0

c  1+1 --> 2
c    (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0 ∧  p_650) -> (-b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0)
c  in CNF:
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_2
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨  b^{13, 51}_1
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ -p_650 ∨ -b^{13, 51}_0
c  in DIMACS:
 12143  12144 -12145 -650 -12146 0
 12143  12144 -12145 -650  12147 0
 12143  12144 -12145 -650 -12148 0

c  2+1 --> break 
c    (-b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧  p_650) -> break
c  in CNF:
c     b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 12143 -12144  12145 -650 1162 0


c  2-1 --> 1
c    (-b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧ -p_650) -> (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0)
c  in CNF:
c     b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_2
c     b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_1
c     b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨  b^{13, 51}_0
c  in DIMACS:
 12143 -12144  12145  650 -12146 0
 12143 -12144  12145  650 -12147 0
 12143 -12144  12145  650  12148 0

c  1-1 --> 0
c    (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0 ∧ -p_650) -> (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧ -b^{13, 51}_0)
c  in CNF:
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_2
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_1
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_0
c  in DIMACS:
 12143  12144 -12145  650 -12146 0
 12143  12144 -12145  650 -12147 0
 12143  12144 -12145  650 -12148 0

c  0-1 --> -1
c    (-b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧ -p_650) -> ( b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0)
c  in CNF:
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨  b^{13, 51}_2
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_1
c     b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨  b^{13, 51}_0
c  in DIMACS:
 12143  12144  12145  650  12146 0
 12143  12144  12145  650 -12147 0
 12143  12144  12145  650  12148 0

c  -1-1 --> -2
c    ( b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧  b^{13, 50}_0 ∧ -p_650) -> ( b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0)
c  in CNF:
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨  b^{13, 51}_2
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨  b^{13, 51}_1
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨  p_650 ∨ -b^{13, 51}_0
c  in DIMACS:
-12143  12144 -12145  650  12146 0
-12143  12144 -12145  650  12147 0
-12143  12144 -12145  650 -12148 0

c  -2-1 --> break 
c    ( b^{13, 50}_2 ∧  b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨  b^{13, 50}_0 ∨  p_650 ∨ break
c  in DIMACS:
-12143 -12144  12145  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 50}_2 ∧ -b^{13, 50}_1 ∧ -b^{13, 50}_0 ∧ true) 
c  in CNF:
c    -b^{13, 50}_2 ∨  b^{13, 50}_1 ∨  b^{13, 50}_0 ∨ false 
c  in DIMACS:
-12143  12144  12145  0

c  3 does not represent an automaton state.
c    -(-b^{13, 50}_2 ∧  b^{13, 50}_1 ∧  b^{13, 50}_0 ∧ true) 
c  in CNF:
c     b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ false 
c  in DIMACS:
 12143 -12144 -12145  0
c  -3 does not represent an automaton state.
c    -( b^{13, 50}_2 ∧  b^{13, 50}_1 ∧  b^{13, 50}_0 ∧ true) 
c  in CNF:
c    -b^{13, 50}_2 ∨ -b^{13, 50}_1 ∨ -b^{13, 50}_0 ∨ false 
c  in DIMACS:
-12143 -12144 -12145  0

c i = 51
c  -2+1 --> -1
c    ( b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧  p_663) -> ( b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0)
c  in CNF:
c    -b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨  b^{13, 52}_2
c    -b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_1
c    -b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨  b^{13, 52}_0
c  in DIMACS:
-12146 -12147  12148 -663  12149 0
-12146 -12147  12148 -663 -12150 0
-12146 -12147  12148 -663  12151 0

c  -1+1 --> 0
c    ( b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0 ∧  p_663) -> (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧ -b^{13, 52}_0)
c  in CNF:
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_2
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_1
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_0
c  in DIMACS:
-12146  12147 -12148 -663 -12149 0
-12146  12147 -12148 -663 -12150 0
-12146  12147 -12148 -663 -12151 0

c  0+1 --> 1
c    (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧  p_663) -> (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0)
c  in CNF:
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_2
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_1
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨  b^{13, 52}_0
c  in DIMACS:
 12146  12147  12148 -663 -12149 0
 12146  12147  12148 -663 -12150 0
 12146  12147  12148 -663  12151 0

c  1+1 --> 2
c    (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0 ∧  p_663) -> (-b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0)
c  in CNF:
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_2
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨  b^{13, 52}_1
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ -p_663 ∨ -b^{13, 52}_0
c  in DIMACS:
 12146  12147 -12148 -663 -12149 0
 12146  12147 -12148 -663  12150 0
 12146  12147 -12148 -663 -12151 0

c  2+1 --> break 
c    (-b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧  p_663) -> break
c  in CNF:
c     b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 12146 -12147  12148 -663 1162 0


c  2-1 --> 1
c    (-b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧ -p_663) -> (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0)
c  in CNF:
c     b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_2
c     b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_1
c     b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨  b^{13, 52}_0
c  in DIMACS:
 12146 -12147  12148  663 -12149 0
 12146 -12147  12148  663 -12150 0
 12146 -12147  12148  663  12151 0

c  1-1 --> 0
c    (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0 ∧ -p_663) -> (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧ -b^{13, 52}_0)
c  in CNF:
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_2
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_1
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_0
c  in DIMACS:
 12146  12147 -12148  663 -12149 0
 12146  12147 -12148  663 -12150 0
 12146  12147 -12148  663 -12151 0

c  0-1 --> -1
c    (-b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧ -p_663) -> ( b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0)
c  in CNF:
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨  b^{13, 52}_2
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_1
c     b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨  b^{13, 52}_0
c  in DIMACS:
 12146  12147  12148  663  12149 0
 12146  12147  12148  663 -12150 0
 12146  12147  12148  663  12151 0

c  -1-1 --> -2
c    ( b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧  b^{13, 51}_0 ∧ -p_663) -> ( b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0)
c  in CNF:
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨  b^{13, 52}_2
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨  b^{13, 52}_1
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨  p_663 ∨ -b^{13, 52}_0
c  in DIMACS:
-12146  12147 -12148  663  12149 0
-12146  12147 -12148  663  12150 0
-12146  12147 -12148  663 -12151 0

c  -2-1 --> break 
c    ( b^{13, 51}_2 ∧  b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨  b^{13, 51}_0 ∨  p_663 ∨ break
c  in DIMACS:
-12146 -12147  12148  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 51}_2 ∧ -b^{13, 51}_1 ∧ -b^{13, 51}_0 ∧ true) 
c  in CNF:
c    -b^{13, 51}_2 ∨  b^{13, 51}_1 ∨  b^{13, 51}_0 ∨ false 
c  in DIMACS:
-12146  12147  12148  0

c  3 does not represent an automaton state.
c    -(-b^{13, 51}_2 ∧  b^{13, 51}_1 ∧  b^{13, 51}_0 ∧ true) 
c  in CNF:
c     b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ false 
c  in DIMACS:
 12146 -12147 -12148  0
c  -3 does not represent an automaton state.
c    -( b^{13, 51}_2 ∧  b^{13, 51}_1 ∧  b^{13, 51}_0 ∧ true) 
c  in CNF:
c    -b^{13, 51}_2 ∨ -b^{13, 51}_1 ∨ -b^{13, 51}_0 ∨ false 
c  in DIMACS:
-12146 -12147 -12148  0

c i = 52
c  -2+1 --> -1
c    ( b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧  p_676) -> ( b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0)
c  in CNF:
c    -b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨  b^{13, 53}_2
c    -b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_1
c    -b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨  b^{13, 53}_0
c  in DIMACS:
-12149 -12150  12151 -676  12152 0
-12149 -12150  12151 -676 -12153 0
-12149 -12150  12151 -676  12154 0

c  -1+1 --> 0
c    ( b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0 ∧  p_676) -> (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧ -b^{13, 53}_0)
c  in CNF:
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_2
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_1
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_0
c  in DIMACS:
-12149  12150 -12151 -676 -12152 0
-12149  12150 -12151 -676 -12153 0
-12149  12150 -12151 -676 -12154 0

c  0+1 --> 1
c    (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧  p_676) -> (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0)
c  in CNF:
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_2
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_1
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨  b^{13, 53}_0
c  in DIMACS:
 12149  12150  12151 -676 -12152 0
 12149  12150  12151 -676 -12153 0
 12149  12150  12151 -676  12154 0

c  1+1 --> 2
c    (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0 ∧  p_676) -> (-b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0)
c  in CNF:
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_2
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨  b^{13, 53}_1
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ -p_676 ∨ -b^{13, 53}_0
c  in DIMACS:
 12149  12150 -12151 -676 -12152 0
 12149  12150 -12151 -676  12153 0
 12149  12150 -12151 -676 -12154 0

c  2+1 --> break 
c    (-b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧  p_676) -> break
c  in CNF:
c     b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 12149 -12150  12151 -676 1162 0


c  2-1 --> 1
c    (-b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧ -p_676) -> (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0)
c  in CNF:
c     b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_2
c     b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_1
c     b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨  b^{13, 53}_0
c  in DIMACS:
 12149 -12150  12151  676 -12152 0
 12149 -12150  12151  676 -12153 0
 12149 -12150  12151  676  12154 0

c  1-1 --> 0
c    (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0 ∧ -p_676) -> (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧ -b^{13, 53}_0)
c  in CNF:
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_2
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_1
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_0
c  in DIMACS:
 12149  12150 -12151  676 -12152 0
 12149  12150 -12151  676 -12153 0
 12149  12150 -12151  676 -12154 0

c  0-1 --> -1
c    (-b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧ -p_676) -> ( b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0)
c  in CNF:
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨  b^{13, 53}_2
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_1
c     b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨  b^{13, 53}_0
c  in DIMACS:
 12149  12150  12151  676  12152 0
 12149  12150  12151  676 -12153 0
 12149  12150  12151  676  12154 0

c  -1-1 --> -2
c    ( b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧  b^{13, 52}_0 ∧ -p_676) -> ( b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0)
c  in CNF:
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨  b^{13, 53}_2
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨  b^{13, 53}_1
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨  p_676 ∨ -b^{13, 53}_0
c  in DIMACS:
-12149  12150 -12151  676  12152 0
-12149  12150 -12151  676  12153 0
-12149  12150 -12151  676 -12154 0

c  -2-1 --> break 
c    ( b^{13, 52}_2 ∧  b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨  b^{13, 52}_0 ∨  p_676 ∨ break
c  in DIMACS:
-12149 -12150  12151  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 52}_2 ∧ -b^{13, 52}_1 ∧ -b^{13, 52}_0 ∧ true) 
c  in CNF:
c    -b^{13, 52}_2 ∨  b^{13, 52}_1 ∨  b^{13, 52}_0 ∨ false 
c  in DIMACS:
-12149  12150  12151  0

c  3 does not represent an automaton state.
c    -(-b^{13, 52}_2 ∧  b^{13, 52}_1 ∧  b^{13, 52}_0 ∧ true) 
c  in CNF:
c     b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ false 
c  in DIMACS:
 12149 -12150 -12151  0
c  -3 does not represent an automaton state.
c    -( b^{13, 52}_2 ∧  b^{13, 52}_1 ∧  b^{13, 52}_0 ∧ true) 
c  in CNF:
c    -b^{13, 52}_2 ∨ -b^{13, 52}_1 ∨ -b^{13, 52}_0 ∨ false 
c  in DIMACS:
-12149 -12150 -12151  0

c i = 53
c  -2+1 --> -1
c    ( b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧  p_689) -> ( b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0)
c  in CNF:
c    -b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨  b^{13, 54}_2
c    -b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_1
c    -b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨  b^{13, 54}_0
c  in DIMACS:
-12152 -12153  12154 -689  12155 0
-12152 -12153  12154 -689 -12156 0
-12152 -12153  12154 -689  12157 0

c  -1+1 --> 0
c    ( b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0 ∧  p_689) -> (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧ -b^{13, 54}_0)
c  in CNF:
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_2
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_1
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_0
c  in DIMACS:
-12152  12153 -12154 -689 -12155 0
-12152  12153 -12154 -689 -12156 0
-12152  12153 -12154 -689 -12157 0

c  0+1 --> 1
c    (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧  p_689) -> (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0)
c  in CNF:
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_2
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_1
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨  b^{13, 54}_0
c  in DIMACS:
 12152  12153  12154 -689 -12155 0
 12152  12153  12154 -689 -12156 0
 12152  12153  12154 -689  12157 0

c  1+1 --> 2
c    (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0 ∧  p_689) -> (-b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0)
c  in CNF:
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_2
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨  b^{13, 54}_1
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ -p_689 ∨ -b^{13, 54}_0
c  in DIMACS:
 12152  12153 -12154 -689 -12155 0
 12152  12153 -12154 -689  12156 0
 12152  12153 -12154 -689 -12157 0

c  2+1 --> break 
c    (-b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧  p_689) -> break
c  in CNF:
c     b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ -p_689 ∨ break
c  in DIMACS:
 12152 -12153  12154 -689 1162 0


c  2-1 --> 1
c    (-b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧ -p_689) -> (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0)
c  in CNF:
c     b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_2
c     b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_1
c     b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨  b^{13, 54}_0
c  in DIMACS:
 12152 -12153  12154  689 -12155 0
 12152 -12153  12154  689 -12156 0
 12152 -12153  12154  689  12157 0

c  1-1 --> 0
c    (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0 ∧ -p_689) -> (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧ -b^{13, 54}_0)
c  in CNF:
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_2
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_1
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_0
c  in DIMACS:
 12152  12153 -12154  689 -12155 0
 12152  12153 -12154  689 -12156 0
 12152  12153 -12154  689 -12157 0

c  0-1 --> -1
c    (-b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧ -p_689) -> ( b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0)
c  in CNF:
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨  b^{13, 54}_2
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_1
c     b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨  b^{13, 54}_0
c  in DIMACS:
 12152  12153  12154  689  12155 0
 12152  12153  12154  689 -12156 0
 12152  12153  12154  689  12157 0

c  -1-1 --> -2
c    ( b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧  b^{13, 53}_0 ∧ -p_689) -> ( b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0)
c  in CNF:
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨  b^{13, 54}_2
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨  b^{13, 54}_1
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨  p_689 ∨ -b^{13, 54}_0
c  in DIMACS:
-12152  12153 -12154  689  12155 0
-12152  12153 -12154  689  12156 0
-12152  12153 -12154  689 -12157 0

c  -2-1 --> break 
c    ( b^{13, 53}_2 ∧  b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧ -p_689) -> break
c  in CNF:
c    -b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨  b^{13, 53}_0 ∨  p_689 ∨ break
c  in DIMACS:
-12152 -12153  12154  689 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 53}_2 ∧ -b^{13, 53}_1 ∧ -b^{13, 53}_0 ∧ true) 
c  in CNF:
c    -b^{13, 53}_2 ∨  b^{13, 53}_1 ∨  b^{13, 53}_0 ∨ false 
c  in DIMACS:
-12152  12153  12154  0

c  3 does not represent an automaton state.
c    -(-b^{13, 53}_2 ∧  b^{13, 53}_1 ∧  b^{13, 53}_0 ∧ true) 
c  in CNF:
c     b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ false 
c  in DIMACS:
 12152 -12153 -12154  0
c  -3 does not represent an automaton state.
c    -( b^{13, 53}_2 ∧  b^{13, 53}_1 ∧  b^{13, 53}_0 ∧ true) 
c  in CNF:
c    -b^{13, 53}_2 ∨ -b^{13, 53}_1 ∨ -b^{13, 53}_0 ∨ false 
c  in DIMACS:
-12152 -12153 -12154  0

c i = 54
c  -2+1 --> -1
c    ( b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧  p_702) -> ( b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0)
c  in CNF:
c    -b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨  b^{13, 55}_2
c    -b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_1
c    -b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨  b^{13, 55}_0
c  in DIMACS:
-12155 -12156  12157 -702  12158 0
-12155 -12156  12157 -702 -12159 0
-12155 -12156  12157 -702  12160 0

c  -1+1 --> 0
c    ( b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0 ∧  p_702) -> (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧ -b^{13, 55}_0)
c  in CNF:
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_2
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_1
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_0
c  in DIMACS:
-12155  12156 -12157 -702 -12158 0
-12155  12156 -12157 -702 -12159 0
-12155  12156 -12157 -702 -12160 0

c  0+1 --> 1
c    (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧  p_702) -> (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0)
c  in CNF:
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_2
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_1
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨  b^{13, 55}_0
c  in DIMACS:
 12155  12156  12157 -702 -12158 0
 12155  12156  12157 -702 -12159 0
 12155  12156  12157 -702  12160 0

c  1+1 --> 2
c    (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0 ∧  p_702) -> (-b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0)
c  in CNF:
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_2
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨  b^{13, 55}_1
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ -p_702 ∨ -b^{13, 55}_0
c  in DIMACS:
 12155  12156 -12157 -702 -12158 0
 12155  12156 -12157 -702  12159 0
 12155  12156 -12157 -702 -12160 0

c  2+1 --> break 
c    (-b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧  p_702) -> break
c  in CNF:
c     b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 12155 -12156  12157 -702 1162 0


c  2-1 --> 1
c    (-b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧ -p_702) -> (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0)
c  in CNF:
c     b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_2
c     b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_1
c     b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨  b^{13, 55}_0
c  in DIMACS:
 12155 -12156  12157  702 -12158 0
 12155 -12156  12157  702 -12159 0
 12155 -12156  12157  702  12160 0

c  1-1 --> 0
c    (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0 ∧ -p_702) -> (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧ -b^{13, 55}_0)
c  in CNF:
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_2
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_1
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_0
c  in DIMACS:
 12155  12156 -12157  702 -12158 0
 12155  12156 -12157  702 -12159 0
 12155  12156 -12157  702 -12160 0

c  0-1 --> -1
c    (-b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧ -p_702) -> ( b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0)
c  in CNF:
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨  b^{13, 55}_2
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_1
c     b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨  b^{13, 55}_0
c  in DIMACS:
 12155  12156  12157  702  12158 0
 12155  12156  12157  702 -12159 0
 12155  12156  12157  702  12160 0

c  -1-1 --> -2
c    ( b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧  b^{13, 54}_0 ∧ -p_702) -> ( b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0)
c  in CNF:
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨  b^{13, 55}_2
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨  b^{13, 55}_1
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨  p_702 ∨ -b^{13, 55}_0
c  in DIMACS:
-12155  12156 -12157  702  12158 0
-12155  12156 -12157  702  12159 0
-12155  12156 -12157  702 -12160 0

c  -2-1 --> break 
c    ( b^{13, 54}_2 ∧  b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨  b^{13, 54}_0 ∨  p_702 ∨ break
c  in DIMACS:
-12155 -12156  12157  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 54}_2 ∧ -b^{13, 54}_1 ∧ -b^{13, 54}_0 ∧ true) 
c  in CNF:
c    -b^{13, 54}_2 ∨  b^{13, 54}_1 ∨  b^{13, 54}_0 ∨ false 
c  in DIMACS:
-12155  12156  12157  0

c  3 does not represent an automaton state.
c    -(-b^{13, 54}_2 ∧  b^{13, 54}_1 ∧  b^{13, 54}_0 ∧ true) 
c  in CNF:
c     b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ false 
c  in DIMACS:
 12155 -12156 -12157  0
c  -3 does not represent an automaton state.
c    -( b^{13, 54}_2 ∧  b^{13, 54}_1 ∧  b^{13, 54}_0 ∧ true) 
c  in CNF:
c    -b^{13, 54}_2 ∨ -b^{13, 54}_1 ∨ -b^{13, 54}_0 ∨ false 
c  in DIMACS:
-12155 -12156 -12157  0

c i = 55
c  -2+1 --> -1
c    ( b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧  p_715) -> ( b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0)
c  in CNF:
c    -b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨  b^{13, 56}_2
c    -b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_1
c    -b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨  b^{13, 56}_0
c  in DIMACS:
-12158 -12159  12160 -715  12161 0
-12158 -12159  12160 -715 -12162 0
-12158 -12159  12160 -715  12163 0

c  -1+1 --> 0
c    ( b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0 ∧  p_715) -> (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧ -b^{13, 56}_0)
c  in CNF:
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_2
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_1
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_0
c  in DIMACS:
-12158  12159 -12160 -715 -12161 0
-12158  12159 -12160 -715 -12162 0
-12158  12159 -12160 -715 -12163 0

c  0+1 --> 1
c    (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧  p_715) -> (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0)
c  in CNF:
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_2
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_1
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨  b^{13, 56}_0
c  in DIMACS:
 12158  12159  12160 -715 -12161 0
 12158  12159  12160 -715 -12162 0
 12158  12159  12160 -715  12163 0

c  1+1 --> 2
c    (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0 ∧  p_715) -> (-b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0)
c  in CNF:
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_2
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨  b^{13, 56}_1
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ -p_715 ∨ -b^{13, 56}_0
c  in DIMACS:
 12158  12159 -12160 -715 -12161 0
 12158  12159 -12160 -715  12162 0
 12158  12159 -12160 -715 -12163 0

c  2+1 --> break 
c    (-b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧  p_715) -> break
c  in CNF:
c     b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 12158 -12159  12160 -715 1162 0


c  2-1 --> 1
c    (-b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧ -p_715) -> (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0)
c  in CNF:
c     b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_2
c     b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_1
c     b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨  b^{13, 56}_0
c  in DIMACS:
 12158 -12159  12160  715 -12161 0
 12158 -12159  12160  715 -12162 0
 12158 -12159  12160  715  12163 0

c  1-1 --> 0
c    (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0 ∧ -p_715) -> (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧ -b^{13, 56}_0)
c  in CNF:
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_2
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_1
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_0
c  in DIMACS:
 12158  12159 -12160  715 -12161 0
 12158  12159 -12160  715 -12162 0
 12158  12159 -12160  715 -12163 0

c  0-1 --> -1
c    (-b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧ -p_715) -> ( b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0)
c  in CNF:
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨  b^{13, 56}_2
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_1
c     b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨  b^{13, 56}_0
c  in DIMACS:
 12158  12159  12160  715  12161 0
 12158  12159  12160  715 -12162 0
 12158  12159  12160  715  12163 0

c  -1-1 --> -2
c    ( b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧  b^{13, 55}_0 ∧ -p_715) -> ( b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0)
c  in CNF:
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨  b^{13, 56}_2
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨  b^{13, 56}_1
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨  p_715 ∨ -b^{13, 56}_0
c  in DIMACS:
-12158  12159 -12160  715  12161 0
-12158  12159 -12160  715  12162 0
-12158  12159 -12160  715 -12163 0

c  -2-1 --> break 
c    ( b^{13, 55}_2 ∧  b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨  b^{13, 55}_0 ∨  p_715 ∨ break
c  in DIMACS:
-12158 -12159  12160  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 55}_2 ∧ -b^{13, 55}_1 ∧ -b^{13, 55}_0 ∧ true) 
c  in CNF:
c    -b^{13, 55}_2 ∨  b^{13, 55}_1 ∨  b^{13, 55}_0 ∨ false 
c  in DIMACS:
-12158  12159  12160  0

c  3 does not represent an automaton state.
c    -(-b^{13, 55}_2 ∧  b^{13, 55}_1 ∧  b^{13, 55}_0 ∧ true) 
c  in CNF:
c     b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ false 
c  in DIMACS:
 12158 -12159 -12160  0
c  -3 does not represent an automaton state.
c    -( b^{13, 55}_2 ∧  b^{13, 55}_1 ∧  b^{13, 55}_0 ∧ true) 
c  in CNF:
c    -b^{13, 55}_2 ∨ -b^{13, 55}_1 ∨ -b^{13, 55}_0 ∨ false 
c  in DIMACS:
-12158 -12159 -12160  0

c i = 56
c  -2+1 --> -1
c    ( b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧  p_728) -> ( b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0)
c  in CNF:
c    -b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨  b^{13, 57}_2
c    -b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_1
c    -b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨  b^{13, 57}_0
c  in DIMACS:
-12161 -12162  12163 -728  12164 0
-12161 -12162  12163 -728 -12165 0
-12161 -12162  12163 -728  12166 0

c  -1+1 --> 0
c    ( b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0 ∧  p_728) -> (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧ -b^{13, 57}_0)
c  in CNF:
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_2
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_1
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_0
c  in DIMACS:
-12161  12162 -12163 -728 -12164 0
-12161  12162 -12163 -728 -12165 0
-12161  12162 -12163 -728 -12166 0

c  0+1 --> 1
c    (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧  p_728) -> (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0)
c  in CNF:
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_2
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_1
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨  b^{13, 57}_0
c  in DIMACS:
 12161  12162  12163 -728 -12164 0
 12161  12162  12163 -728 -12165 0
 12161  12162  12163 -728  12166 0

c  1+1 --> 2
c    (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0 ∧  p_728) -> (-b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0)
c  in CNF:
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_2
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨  b^{13, 57}_1
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ -p_728 ∨ -b^{13, 57}_0
c  in DIMACS:
 12161  12162 -12163 -728 -12164 0
 12161  12162 -12163 -728  12165 0
 12161  12162 -12163 -728 -12166 0

c  2+1 --> break 
c    (-b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧  p_728) -> break
c  in CNF:
c     b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 12161 -12162  12163 -728 1162 0


c  2-1 --> 1
c    (-b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧ -p_728) -> (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0)
c  in CNF:
c     b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_2
c     b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_1
c     b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨  b^{13, 57}_0
c  in DIMACS:
 12161 -12162  12163  728 -12164 0
 12161 -12162  12163  728 -12165 0
 12161 -12162  12163  728  12166 0

c  1-1 --> 0
c    (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0 ∧ -p_728) -> (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧ -b^{13, 57}_0)
c  in CNF:
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_2
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_1
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_0
c  in DIMACS:
 12161  12162 -12163  728 -12164 0
 12161  12162 -12163  728 -12165 0
 12161  12162 -12163  728 -12166 0

c  0-1 --> -1
c    (-b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧ -p_728) -> ( b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0)
c  in CNF:
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨  b^{13, 57}_2
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_1
c     b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨  b^{13, 57}_0
c  in DIMACS:
 12161  12162  12163  728  12164 0
 12161  12162  12163  728 -12165 0
 12161  12162  12163  728  12166 0

c  -1-1 --> -2
c    ( b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧  b^{13, 56}_0 ∧ -p_728) -> ( b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0)
c  in CNF:
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨  b^{13, 57}_2
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨  b^{13, 57}_1
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨  p_728 ∨ -b^{13, 57}_0
c  in DIMACS:
-12161  12162 -12163  728  12164 0
-12161  12162 -12163  728  12165 0
-12161  12162 -12163  728 -12166 0

c  -2-1 --> break 
c    ( b^{13, 56}_2 ∧  b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨  b^{13, 56}_0 ∨  p_728 ∨ break
c  in DIMACS:
-12161 -12162  12163  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 56}_2 ∧ -b^{13, 56}_1 ∧ -b^{13, 56}_0 ∧ true) 
c  in CNF:
c    -b^{13, 56}_2 ∨  b^{13, 56}_1 ∨  b^{13, 56}_0 ∨ false 
c  in DIMACS:
-12161  12162  12163  0

c  3 does not represent an automaton state.
c    -(-b^{13, 56}_2 ∧  b^{13, 56}_1 ∧  b^{13, 56}_0 ∧ true) 
c  in CNF:
c     b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ false 
c  in DIMACS:
 12161 -12162 -12163  0
c  -3 does not represent an automaton state.
c    -( b^{13, 56}_2 ∧  b^{13, 56}_1 ∧  b^{13, 56}_0 ∧ true) 
c  in CNF:
c    -b^{13, 56}_2 ∨ -b^{13, 56}_1 ∨ -b^{13, 56}_0 ∨ false 
c  in DIMACS:
-12161 -12162 -12163  0

c i = 57
c  -2+1 --> -1
c    ( b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧  p_741) -> ( b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0)
c  in CNF:
c    -b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨  b^{13, 58}_2
c    -b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_1
c    -b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨  b^{13, 58}_0
c  in DIMACS:
-12164 -12165  12166 -741  12167 0
-12164 -12165  12166 -741 -12168 0
-12164 -12165  12166 -741  12169 0

c  -1+1 --> 0
c    ( b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0 ∧  p_741) -> (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧ -b^{13, 58}_0)
c  in CNF:
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_2
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_1
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_0
c  in DIMACS:
-12164  12165 -12166 -741 -12167 0
-12164  12165 -12166 -741 -12168 0
-12164  12165 -12166 -741 -12169 0

c  0+1 --> 1
c    (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧  p_741) -> (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0)
c  in CNF:
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_2
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_1
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨  b^{13, 58}_0
c  in DIMACS:
 12164  12165  12166 -741 -12167 0
 12164  12165  12166 -741 -12168 0
 12164  12165  12166 -741  12169 0

c  1+1 --> 2
c    (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0 ∧  p_741) -> (-b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0)
c  in CNF:
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_2
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨  b^{13, 58}_1
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ -p_741 ∨ -b^{13, 58}_0
c  in DIMACS:
 12164  12165 -12166 -741 -12167 0
 12164  12165 -12166 -741  12168 0
 12164  12165 -12166 -741 -12169 0

c  2+1 --> break 
c    (-b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧  p_741) -> break
c  in CNF:
c     b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 12164 -12165  12166 -741 1162 0


c  2-1 --> 1
c    (-b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧ -p_741) -> (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0)
c  in CNF:
c     b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_2
c     b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_1
c     b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨  b^{13, 58}_0
c  in DIMACS:
 12164 -12165  12166  741 -12167 0
 12164 -12165  12166  741 -12168 0
 12164 -12165  12166  741  12169 0

c  1-1 --> 0
c    (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0 ∧ -p_741) -> (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧ -b^{13, 58}_0)
c  in CNF:
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_2
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_1
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_0
c  in DIMACS:
 12164  12165 -12166  741 -12167 0
 12164  12165 -12166  741 -12168 0
 12164  12165 -12166  741 -12169 0

c  0-1 --> -1
c    (-b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧ -p_741) -> ( b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0)
c  in CNF:
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨  b^{13, 58}_2
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_1
c     b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨  b^{13, 58}_0
c  in DIMACS:
 12164  12165  12166  741  12167 0
 12164  12165  12166  741 -12168 0
 12164  12165  12166  741  12169 0

c  -1-1 --> -2
c    ( b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧  b^{13, 57}_0 ∧ -p_741) -> ( b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0)
c  in CNF:
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨  b^{13, 58}_2
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨  b^{13, 58}_1
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨  p_741 ∨ -b^{13, 58}_0
c  in DIMACS:
-12164  12165 -12166  741  12167 0
-12164  12165 -12166  741  12168 0
-12164  12165 -12166  741 -12169 0

c  -2-1 --> break 
c    ( b^{13, 57}_2 ∧  b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨  b^{13, 57}_0 ∨  p_741 ∨ break
c  in DIMACS:
-12164 -12165  12166  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 57}_2 ∧ -b^{13, 57}_1 ∧ -b^{13, 57}_0 ∧ true) 
c  in CNF:
c    -b^{13, 57}_2 ∨  b^{13, 57}_1 ∨  b^{13, 57}_0 ∨ false 
c  in DIMACS:
-12164  12165  12166  0

c  3 does not represent an automaton state.
c    -(-b^{13, 57}_2 ∧  b^{13, 57}_1 ∧  b^{13, 57}_0 ∧ true) 
c  in CNF:
c     b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ false 
c  in DIMACS:
 12164 -12165 -12166  0
c  -3 does not represent an automaton state.
c    -( b^{13, 57}_2 ∧  b^{13, 57}_1 ∧  b^{13, 57}_0 ∧ true) 
c  in CNF:
c    -b^{13, 57}_2 ∨ -b^{13, 57}_1 ∨ -b^{13, 57}_0 ∨ false 
c  in DIMACS:
-12164 -12165 -12166  0

c i = 58
c  -2+1 --> -1
c    ( b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧  p_754) -> ( b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0)
c  in CNF:
c    -b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨  b^{13, 59}_2
c    -b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_1
c    -b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨  b^{13, 59}_0
c  in DIMACS:
-12167 -12168  12169 -754  12170 0
-12167 -12168  12169 -754 -12171 0
-12167 -12168  12169 -754  12172 0

c  -1+1 --> 0
c    ( b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0 ∧  p_754) -> (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧ -b^{13, 59}_0)
c  in CNF:
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_2
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_1
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_0
c  in DIMACS:
-12167  12168 -12169 -754 -12170 0
-12167  12168 -12169 -754 -12171 0
-12167  12168 -12169 -754 -12172 0

c  0+1 --> 1
c    (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧  p_754) -> (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0)
c  in CNF:
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_2
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_1
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨  b^{13, 59}_0
c  in DIMACS:
 12167  12168  12169 -754 -12170 0
 12167  12168  12169 -754 -12171 0
 12167  12168  12169 -754  12172 0

c  1+1 --> 2
c    (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0 ∧  p_754) -> (-b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0)
c  in CNF:
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_2
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨  b^{13, 59}_1
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ -p_754 ∨ -b^{13, 59}_0
c  in DIMACS:
 12167  12168 -12169 -754 -12170 0
 12167  12168 -12169 -754  12171 0
 12167  12168 -12169 -754 -12172 0

c  2+1 --> break 
c    (-b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧  p_754) -> break
c  in CNF:
c     b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 12167 -12168  12169 -754 1162 0


c  2-1 --> 1
c    (-b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧ -p_754) -> (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0)
c  in CNF:
c     b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_2
c     b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_1
c     b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨  b^{13, 59}_0
c  in DIMACS:
 12167 -12168  12169  754 -12170 0
 12167 -12168  12169  754 -12171 0
 12167 -12168  12169  754  12172 0

c  1-1 --> 0
c    (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0 ∧ -p_754) -> (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧ -b^{13, 59}_0)
c  in CNF:
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_2
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_1
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_0
c  in DIMACS:
 12167  12168 -12169  754 -12170 0
 12167  12168 -12169  754 -12171 0
 12167  12168 -12169  754 -12172 0

c  0-1 --> -1
c    (-b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧ -p_754) -> ( b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0)
c  in CNF:
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨  b^{13, 59}_2
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_1
c     b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨  b^{13, 59}_0
c  in DIMACS:
 12167  12168  12169  754  12170 0
 12167  12168  12169  754 -12171 0
 12167  12168  12169  754  12172 0

c  -1-1 --> -2
c    ( b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧  b^{13, 58}_0 ∧ -p_754) -> ( b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0)
c  in CNF:
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨  b^{13, 59}_2
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨  b^{13, 59}_1
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨  p_754 ∨ -b^{13, 59}_0
c  in DIMACS:
-12167  12168 -12169  754  12170 0
-12167  12168 -12169  754  12171 0
-12167  12168 -12169  754 -12172 0

c  -2-1 --> break 
c    ( b^{13, 58}_2 ∧  b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨  b^{13, 58}_0 ∨  p_754 ∨ break
c  in DIMACS:
-12167 -12168  12169  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 58}_2 ∧ -b^{13, 58}_1 ∧ -b^{13, 58}_0 ∧ true) 
c  in CNF:
c    -b^{13, 58}_2 ∨  b^{13, 58}_1 ∨  b^{13, 58}_0 ∨ false 
c  in DIMACS:
-12167  12168  12169  0

c  3 does not represent an automaton state.
c    -(-b^{13, 58}_2 ∧  b^{13, 58}_1 ∧  b^{13, 58}_0 ∧ true) 
c  in CNF:
c     b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ false 
c  in DIMACS:
 12167 -12168 -12169  0
c  -3 does not represent an automaton state.
c    -( b^{13, 58}_2 ∧  b^{13, 58}_1 ∧  b^{13, 58}_0 ∧ true) 
c  in CNF:
c    -b^{13, 58}_2 ∨ -b^{13, 58}_1 ∨ -b^{13, 58}_0 ∨ false 
c  in DIMACS:
-12167 -12168 -12169  0

c i = 59
c  -2+1 --> -1
c    ( b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧  p_767) -> ( b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0)
c  in CNF:
c    -b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨  b^{13, 60}_2
c    -b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_1
c    -b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨  b^{13, 60}_0
c  in DIMACS:
-12170 -12171  12172 -767  12173 0
-12170 -12171  12172 -767 -12174 0
-12170 -12171  12172 -767  12175 0

c  -1+1 --> 0
c    ( b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0 ∧  p_767) -> (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧ -b^{13, 60}_0)
c  in CNF:
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_2
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_1
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_0
c  in DIMACS:
-12170  12171 -12172 -767 -12173 0
-12170  12171 -12172 -767 -12174 0
-12170  12171 -12172 -767 -12175 0

c  0+1 --> 1
c    (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧  p_767) -> (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0)
c  in CNF:
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_2
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_1
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨  b^{13, 60}_0
c  in DIMACS:
 12170  12171  12172 -767 -12173 0
 12170  12171  12172 -767 -12174 0
 12170  12171  12172 -767  12175 0

c  1+1 --> 2
c    (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0 ∧  p_767) -> (-b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0)
c  in CNF:
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_2
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨  b^{13, 60}_1
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ -p_767 ∨ -b^{13, 60}_0
c  in DIMACS:
 12170  12171 -12172 -767 -12173 0
 12170  12171 -12172 -767  12174 0
 12170  12171 -12172 -767 -12175 0

c  2+1 --> break 
c    (-b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧  p_767) -> break
c  in CNF:
c     b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ -p_767 ∨ break
c  in DIMACS:
 12170 -12171  12172 -767 1162 0


c  2-1 --> 1
c    (-b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧ -p_767) -> (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0)
c  in CNF:
c     b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_2
c     b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_1
c     b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨  b^{13, 60}_0
c  in DIMACS:
 12170 -12171  12172  767 -12173 0
 12170 -12171  12172  767 -12174 0
 12170 -12171  12172  767  12175 0

c  1-1 --> 0
c    (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0 ∧ -p_767) -> (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧ -b^{13, 60}_0)
c  in CNF:
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_2
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_1
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_0
c  in DIMACS:
 12170  12171 -12172  767 -12173 0
 12170  12171 -12172  767 -12174 0
 12170  12171 -12172  767 -12175 0

c  0-1 --> -1
c    (-b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧ -p_767) -> ( b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0)
c  in CNF:
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨  b^{13, 60}_2
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_1
c     b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨  b^{13, 60}_0
c  in DIMACS:
 12170  12171  12172  767  12173 0
 12170  12171  12172  767 -12174 0
 12170  12171  12172  767  12175 0

c  -1-1 --> -2
c    ( b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧  b^{13, 59}_0 ∧ -p_767) -> ( b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0)
c  in CNF:
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨  b^{13, 60}_2
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨  b^{13, 60}_1
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨  p_767 ∨ -b^{13, 60}_0
c  in DIMACS:
-12170  12171 -12172  767  12173 0
-12170  12171 -12172  767  12174 0
-12170  12171 -12172  767 -12175 0

c  -2-1 --> break 
c    ( b^{13, 59}_2 ∧  b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧ -p_767) -> break
c  in CNF:
c    -b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨  b^{13, 59}_0 ∨  p_767 ∨ break
c  in DIMACS:
-12170 -12171  12172  767 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 59}_2 ∧ -b^{13, 59}_1 ∧ -b^{13, 59}_0 ∧ true) 
c  in CNF:
c    -b^{13, 59}_2 ∨  b^{13, 59}_1 ∨  b^{13, 59}_0 ∨ false 
c  in DIMACS:
-12170  12171  12172  0

c  3 does not represent an automaton state.
c    -(-b^{13, 59}_2 ∧  b^{13, 59}_1 ∧  b^{13, 59}_0 ∧ true) 
c  in CNF:
c     b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ false 
c  in DIMACS:
 12170 -12171 -12172  0
c  -3 does not represent an automaton state.
c    -( b^{13, 59}_2 ∧  b^{13, 59}_1 ∧  b^{13, 59}_0 ∧ true) 
c  in CNF:
c    -b^{13, 59}_2 ∨ -b^{13, 59}_1 ∨ -b^{13, 59}_0 ∨ false 
c  in DIMACS:
-12170 -12171 -12172  0

c i = 60
c  -2+1 --> -1
c    ( b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧  p_780) -> ( b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0)
c  in CNF:
c    -b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨  b^{13, 61}_2
c    -b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_1
c    -b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨  b^{13, 61}_0
c  in DIMACS:
-12173 -12174  12175 -780  12176 0
-12173 -12174  12175 -780 -12177 0
-12173 -12174  12175 -780  12178 0

c  -1+1 --> 0
c    ( b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0 ∧  p_780) -> (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧ -b^{13, 61}_0)
c  in CNF:
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_2
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_1
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_0
c  in DIMACS:
-12173  12174 -12175 -780 -12176 0
-12173  12174 -12175 -780 -12177 0
-12173  12174 -12175 -780 -12178 0

c  0+1 --> 1
c    (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧  p_780) -> (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0)
c  in CNF:
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_2
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_1
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨  b^{13, 61}_0
c  in DIMACS:
 12173  12174  12175 -780 -12176 0
 12173  12174  12175 -780 -12177 0
 12173  12174  12175 -780  12178 0

c  1+1 --> 2
c    (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0 ∧  p_780) -> (-b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0)
c  in CNF:
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_2
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨  b^{13, 61}_1
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ -p_780 ∨ -b^{13, 61}_0
c  in DIMACS:
 12173  12174 -12175 -780 -12176 0
 12173  12174 -12175 -780  12177 0
 12173  12174 -12175 -780 -12178 0

c  2+1 --> break 
c    (-b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧  p_780) -> break
c  in CNF:
c     b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 12173 -12174  12175 -780 1162 0


c  2-1 --> 1
c    (-b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧ -p_780) -> (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0)
c  in CNF:
c     b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_2
c     b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_1
c     b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨  b^{13, 61}_0
c  in DIMACS:
 12173 -12174  12175  780 -12176 0
 12173 -12174  12175  780 -12177 0
 12173 -12174  12175  780  12178 0

c  1-1 --> 0
c    (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0 ∧ -p_780) -> (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧ -b^{13, 61}_0)
c  in CNF:
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_2
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_1
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_0
c  in DIMACS:
 12173  12174 -12175  780 -12176 0
 12173  12174 -12175  780 -12177 0
 12173  12174 -12175  780 -12178 0

c  0-1 --> -1
c    (-b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧ -p_780) -> ( b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0)
c  in CNF:
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨  b^{13, 61}_2
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_1
c     b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨  b^{13, 61}_0
c  in DIMACS:
 12173  12174  12175  780  12176 0
 12173  12174  12175  780 -12177 0
 12173  12174  12175  780  12178 0

c  -1-1 --> -2
c    ( b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧  b^{13, 60}_0 ∧ -p_780) -> ( b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0)
c  in CNF:
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨  b^{13, 61}_2
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨  b^{13, 61}_1
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨  p_780 ∨ -b^{13, 61}_0
c  in DIMACS:
-12173  12174 -12175  780  12176 0
-12173  12174 -12175  780  12177 0
-12173  12174 -12175  780 -12178 0

c  -2-1 --> break 
c    ( b^{13, 60}_2 ∧  b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨  b^{13, 60}_0 ∨  p_780 ∨ break
c  in DIMACS:
-12173 -12174  12175  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 60}_2 ∧ -b^{13, 60}_1 ∧ -b^{13, 60}_0 ∧ true) 
c  in CNF:
c    -b^{13, 60}_2 ∨  b^{13, 60}_1 ∨  b^{13, 60}_0 ∨ false 
c  in DIMACS:
-12173  12174  12175  0

c  3 does not represent an automaton state.
c    -(-b^{13, 60}_2 ∧  b^{13, 60}_1 ∧  b^{13, 60}_0 ∧ true) 
c  in CNF:
c     b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ false 
c  in DIMACS:
 12173 -12174 -12175  0
c  -3 does not represent an automaton state.
c    -( b^{13, 60}_2 ∧  b^{13, 60}_1 ∧  b^{13, 60}_0 ∧ true) 
c  in CNF:
c    -b^{13, 60}_2 ∨ -b^{13, 60}_1 ∨ -b^{13, 60}_0 ∨ false 
c  in DIMACS:
-12173 -12174 -12175  0

c i = 61
c  -2+1 --> -1
c    ( b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧  p_793) -> ( b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0)
c  in CNF:
c    -b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨  b^{13, 62}_2
c    -b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_1
c    -b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨  b^{13, 62}_0
c  in DIMACS:
-12176 -12177  12178 -793  12179 0
-12176 -12177  12178 -793 -12180 0
-12176 -12177  12178 -793  12181 0

c  -1+1 --> 0
c    ( b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0 ∧  p_793) -> (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧ -b^{13, 62}_0)
c  in CNF:
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_2
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_1
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_0
c  in DIMACS:
-12176  12177 -12178 -793 -12179 0
-12176  12177 -12178 -793 -12180 0
-12176  12177 -12178 -793 -12181 0

c  0+1 --> 1
c    (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧  p_793) -> (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0)
c  in CNF:
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_2
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_1
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨  b^{13, 62}_0
c  in DIMACS:
 12176  12177  12178 -793 -12179 0
 12176  12177  12178 -793 -12180 0
 12176  12177  12178 -793  12181 0

c  1+1 --> 2
c    (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0 ∧  p_793) -> (-b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0)
c  in CNF:
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_2
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨  b^{13, 62}_1
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ -p_793 ∨ -b^{13, 62}_0
c  in DIMACS:
 12176  12177 -12178 -793 -12179 0
 12176  12177 -12178 -793  12180 0
 12176  12177 -12178 -793 -12181 0

c  2+1 --> break 
c    (-b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧  p_793) -> break
c  in CNF:
c     b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ -p_793 ∨ break
c  in DIMACS:
 12176 -12177  12178 -793 1162 0


c  2-1 --> 1
c    (-b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧ -p_793) -> (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0)
c  in CNF:
c     b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_2
c     b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_1
c     b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨  b^{13, 62}_0
c  in DIMACS:
 12176 -12177  12178  793 -12179 0
 12176 -12177  12178  793 -12180 0
 12176 -12177  12178  793  12181 0

c  1-1 --> 0
c    (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0 ∧ -p_793) -> (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧ -b^{13, 62}_0)
c  in CNF:
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_2
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_1
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_0
c  in DIMACS:
 12176  12177 -12178  793 -12179 0
 12176  12177 -12178  793 -12180 0
 12176  12177 -12178  793 -12181 0

c  0-1 --> -1
c    (-b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧ -p_793) -> ( b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0)
c  in CNF:
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨  b^{13, 62}_2
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_1
c     b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨  b^{13, 62}_0
c  in DIMACS:
 12176  12177  12178  793  12179 0
 12176  12177  12178  793 -12180 0
 12176  12177  12178  793  12181 0

c  -1-1 --> -2
c    ( b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧  b^{13, 61}_0 ∧ -p_793) -> ( b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0)
c  in CNF:
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨  b^{13, 62}_2
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨  b^{13, 62}_1
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨  p_793 ∨ -b^{13, 62}_0
c  in DIMACS:
-12176  12177 -12178  793  12179 0
-12176  12177 -12178  793  12180 0
-12176  12177 -12178  793 -12181 0

c  -2-1 --> break 
c    ( b^{13, 61}_2 ∧  b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧ -p_793) -> break
c  in CNF:
c    -b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨  b^{13, 61}_0 ∨  p_793 ∨ break
c  in DIMACS:
-12176 -12177  12178  793 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 61}_2 ∧ -b^{13, 61}_1 ∧ -b^{13, 61}_0 ∧ true) 
c  in CNF:
c    -b^{13, 61}_2 ∨  b^{13, 61}_1 ∨  b^{13, 61}_0 ∨ false 
c  in DIMACS:
-12176  12177  12178  0

c  3 does not represent an automaton state.
c    -(-b^{13, 61}_2 ∧  b^{13, 61}_1 ∧  b^{13, 61}_0 ∧ true) 
c  in CNF:
c     b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ false 
c  in DIMACS:
 12176 -12177 -12178  0
c  -3 does not represent an automaton state.
c    -( b^{13, 61}_2 ∧  b^{13, 61}_1 ∧  b^{13, 61}_0 ∧ true) 
c  in CNF:
c    -b^{13, 61}_2 ∨ -b^{13, 61}_1 ∨ -b^{13, 61}_0 ∨ false 
c  in DIMACS:
-12176 -12177 -12178  0

c i = 62
c  -2+1 --> -1
c    ( b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧  p_806) -> ( b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0)
c  in CNF:
c    -b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨  b^{13, 63}_2
c    -b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_1
c    -b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨  b^{13, 63}_0
c  in DIMACS:
-12179 -12180  12181 -806  12182 0
-12179 -12180  12181 -806 -12183 0
-12179 -12180  12181 -806  12184 0

c  -1+1 --> 0
c    ( b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0 ∧  p_806) -> (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧ -b^{13, 63}_0)
c  in CNF:
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_2
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_1
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_0
c  in DIMACS:
-12179  12180 -12181 -806 -12182 0
-12179  12180 -12181 -806 -12183 0
-12179  12180 -12181 -806 -12184 0

c  0+1 --> 1
c    (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧  p_806) -> (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0)
c  in CNF:
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_2
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_1
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨  b^{13, 63}_0
c  in DIMACS:
 12179  12180  12181 -806 -12182 0
 12179  12180  12181 -806 -12183 0
 12179  12180  12181 -806  12184 0

c  1+1 --> 2
c    (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0 ∧  p_806) -> (-b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0)
c  in CNF:
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_2
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨  b^{13, 63}_1
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ -p_806 ∨ -b^{13, 63}_0
c  in DIMACS:
 12179  12180 -12181 -806 -12182 0
 12179  12180 -12181 -806  12183 0
 12179  12180 -12181 -806 -12184 0

c  2+1 --> break 
c    (-b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧  p_806) -> break
c  in CNF:
c     b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 12179 -12180  12181 -806 1162 0


c  2-1 --> 1
c    (-b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧ -p_806) -> (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0)
c  in CNF:
c     b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_2
c     b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_1
c     b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨  b^{13, 63}_0
c  in DIMACS:
 12179 -12180  12181  806 -12182 0
 12179 -12180  12181  806 -12183 0
 12179 -12180  12181  806  12184 0

c  1-1 --> 0
c    (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0 ∧ -p_806) -> (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧ -b^{13, 63}_0)
c  in CNF:
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_2
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_1
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_0
c  in DIMACS:
 12179  12180 -12181  806 -12182 0
 12179  12180 -12181  806 -12183 0
 12179  12180 -12181  806 -12184 0

c  0-1 --> -1
c    (-b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧ -p_806) -> ( b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0)
c  in CNF:
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨  b^{13, 63}_2
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_1
c     b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨  b^{13, 63}_0
c  in DIMACS:
 12179  12180  12181  806  12182 0
 12179  12180  12181  806 -12183 0
 12179  12180  12181  806  12184 0

c  -1-1 --> -2
c    ( b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧  b^{13, 62}_0 ∧ -p_806) -> ( b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0)
c  in CNF:
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨  b^{13, 63}_2
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨  b^{13, 63}_1
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨  p_806 ∨ -b^{13, 63}_0
c  in DIMACS:
-12179  12180 -12181  806  12182 0
-12179  12180 -12181  806  12183 0
-12179  12180 -12181  806 -12184 0

c  -2-1 --> break 
c    ( b^{13, 62}_2 ∧  b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨  b^{13, 62}_0 ∨  p_806 ∨ break
c  in DIMACS:
-12179 -12180  12181  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 62}_2 ∧ -b^{13, 62}_1 ∧ -b^{13, 62}_0 ∧ true) 
c  in CNF:
c    -b^{13, 62}_2 ∨  b^{13, 62}_1 ∨  b^{13, 62}_0 ∨ false 
c  in DIMACS:
-12179  12180  12181  0

c  3 does not represent an automaton state.
c    -(-b^{13, 62}_2 ∧  b^{13, 62}_1 ∧  b^{13, 62}_0 ∧ true) 
c  in CNF:
c     b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ false 
c  in DIMACS:
 12179 -12180 -12181  0
c  -3 does not represent an automaton state.
c    -( b^{13, 62}_2 ∧  b^{13, 62}_1 ∧  b^{13, 62}_0 ∧ true) 
c  in CNF:
c    -b^{13, 62}_2 ∨ -b^{13, 62}_1 ∨ -b^{13, 62}_0 ∨ false 
c  in DIMACS:
-12179 -12180 -12181  0

c i = 63
c  -2+1 --> -1
c    ( b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧  p_819) -> ( b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0)
c  in CNF:
c    -b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨  b^{13, 64}_2
c    -b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_1
c    -b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨  b^{13, 64}_0
c  in DIMACS:
-12182 -12183  12184 -819  12185 0
-12182 -12183  12184 -819 -12186 0
-12182 -12183  12184 -819  12187 0

c  -1+1 --> 0
c    ( b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0 ∧  p_819) -> (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧ -b^{13, 64}_0)
c  in CNF:
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_2
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_1
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_0
c  in DIMACS:
-12182  12183 -12184 -819 -12185 0
-12182  12183 -12184 -819 -12186 0
-12182  12183 -12184 -819 -12187 0

c  0+1 --> 1
c    (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧  p_819) -> (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0)
c  in CNF:
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_2
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_1
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨  b^{13, 64}_0
c  in DIMACS:
 12182  12183  12184 -819 -12185 0
 12182  12183  12184 -819 -12186 0
 12182  12183  12184 -819  12187 0

c  1+1 --> 2
c    (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0 ∧  p_819) -> (-b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0)
c  in CNF:
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_2
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨  b^{13, 64}_1
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ -p_819 ∨ -b^{13, 64}_0
c  in DIMACS:
 12182  12183 -12184 -819 -12185 0
 12182  12183 -12184 -819  12186 0
 12182  12183 -12184 -819 -12187 0

c  2+1 --> break 
c    (-b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧  p_819) -> break
c  in CNF:
c     b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 12182 -12183  12184 -819 1162 0


c  2-1 --> 1
c    (-b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧ -p_819) -> (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0)
c  in CNF:
c     b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_2
c     b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_1
c     b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨  b^{13, 64}_0
c  in DIMACS:
 12182 -12183  12184  819 -12185 0
 12182 -12183  12184  819 -12186 0
 12182 -12183  12184  819  12187 0

c  1-1 --> 0
c    (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0 ∧ -p_819) -> (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧ -b^{13, 64}_0)
c  in CNF:
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_2
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_1
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_0
c  in DIMACS:
 12182  12183 -12184  819 -12185 0
 12182  12183 -12184  819 -12186 0
 12182  12183 -12184  819 -12187 0

c  0-1 --> -1
c    (-b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧ -p_819) -> ( b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0)
c  in CNF:
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨  b^{13, 64}_2
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_1
c     b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨  b^{13, 64}_0
c  in DIMACS:
 12182  12183  12184  819  12185 0
 12182  12183  12184  819 -12186 0
 12182  12183  12184  819  12187 0

c  -1-1 --> -2
c    ( b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧  b^{13, 63}_0 ∧ -p_819) -> ( b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0)
c  in CNF:
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨  b^{13, 64}_2
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨  b^{13, 64}_1
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨  p_819 ∨ -b^{13, 64}_0
c  in DIMACS:
-12182  12183 -12184  819  12185 0
-12182  12183 -12184  819  12186 0
-12182  12183 -12184  819 -12187 0

c  -2-1 --> break 
c    ( b^{13, 63}_2 ∧  b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨  b^{13, 63}_0 ∨  p_819 ∨ break
c  in DIMACS:
-12182 -12183  12184  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 63}_2 ∧ -b^{13, 63}_1 ∧ -b^{13, 63}_0 ∧ true) 
c  in CNF:
c    -b^{13, 63}_2 ∨  b^{13, 63}_1 ∨  b^{13, 63}_0 ∨ false 
c  in DIMACS:
-12182  12183  12184  0

c  3 does not represent an automaton state.
c    -(-b^{13, 63}_2 ∧  b^{13, 63}_1 ∧  b^{13, 63}_0 ∧ true) 
c  in CNF:
c     b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ false 
c  in DIMACS:
 12182 -12183 -12184  0
c  -3 does not represent an automaton state.
c    -( b^{13, 63}_2 ∧  b^{13, 63}_1 ∧  b^{13, 63}_0 ∧ true) 
c  in CNF:
c    -b^{13, 63}_2 ∨ -b^{13, 63}_1 ∨ -b^{13, 63}_0 ∨ false 
c  in DIMACS:
-12182 -12183 -12184  0

c i = 64
c  -2+1 --> -1
c    ( b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧  p_832) -> ( b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0)
c  in CNF:
c    -b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨  b^{13, 65}_2
c    -b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_1
c    -b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨  b^{13, 65}_0
c  in DIMACS:
-12185 -12186  12187 -832  12188 0
-12185 -12186  12187 -832 -12189 0
-12185 -12186  12187 -832  12190 0

c  -1+1 --> 0
c    ( b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0 ∧  p_832) -> (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧ -b^{13, 65}_0)
c  in CNF:
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_2
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_1
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_0
c  in DIMACS:
-12185  12186 -12187 -832 -12188 0
-12185  12186 -12187 -832 -12189 0
-12185  12186 -12187 -832 -12190 0

c  0+1 --> 1
c    (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧  p_832) -> (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0)
c  in CNF:
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_2
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_1
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨  b^{13, 65}_0
c  in DIMACS:
 12185  12186  12187 -832 -12188 0
 12185  12186  12187 -832 -12189 0
 12185  12186  12187 -832  12190 0

c  1+1 --> 2
c    (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0 ∧  p_832) -> (-b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0)
c  in CNF:
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_2
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨  b^{13, 65}_1
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ -p_832 ∨ -b^{13, 65}_0
c  in DIMACS:
 12185  12186 -12187 -832 -12188 0
 12185  12186 -12187 -832  12189 0
 12185  12186 -12187 -832 -12190 0

c  2+1 --> break 
c    (-b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧  p_832) -> break
c  in CNF:
c     b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 12185 -12186  12187 -832 1162 0


c  2-1 --> 1
c    (-b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧ -p_832) -> (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0)
c  in CNF:
c     b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_2
c     b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_1
c     b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨  b^{13, 65}_0
c  in DIMACS:
 12185 -12186  12187  832 -12188 0
 12185 -12186  12187  832 -12189 0
 12185 -12186  12187  832  12190 0

c  1-1 --> 0
c    (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0 ∧ -p_832) -> (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧ -b^{13, 65}_0)
c  in CNF:
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_2
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_1
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_0
c  in DIMACS:
 12185  12186 -12187  832 -12188 0
 12185  12186 -12187  832 -12189 0
 12185  12186 -12187  832 -12190 0

c  0-1 --> -1
c    (-b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧ -p_832) -> ( b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0)
c  in CNF:
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨  b^{13, 65}_2
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_1
c     b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨  b^{13, 65}_0
c  in DIMACS:
 12185  12186  12187  832  12188 0
 12185  12186  12187  832 -12189 0
 12185  12186  12187  832  12190 0

c  -1-1 --> -2
c    ( b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧  b^{13, 64}_0 ∧ -p_832) -> ( b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0)
c  in CNF:
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨  b^{13, 65}_2
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨  b^{13, 65}_1
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨  p_832 ∨ -b^{13, 65}_0
c  in DIMACS:
-12185  12186 -12187  832  12188 0
-12185  12186 -12187  832  12189 0
-12185  12186 -12187  832 -12190 0

c  -2-1 --> break 
c    ( b^{13, 64}_2 ∧  b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨  b^{13, 64}_0 ∨  p_832 ∨ break
c  in DIMACS:
-12185 -12186  12187  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 64}_2 ∧ -b^{13, 64}_1 ∧ -b^{13, 64}_0 ∧ true) 
c  in CNF:
c    -b^{13, 64}_2 ∨  b^{13, 64}_1 ∨  b^{13, 64}_0 ∨ false 
c  in DIMACS:
-12185  12186  12187  0

c  3 does not represent an automaton state.
c    -(-b^{13, 64}_2 ∧  b^{13, 64}_1 ∧  b^{13, 64}_0 ∧ true) 
c  in CNF:
c     b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ false 
c  in DIMACS:
 12185 -12186 -12187  0
c  -3 does not represent an automaton state.
c    -( b^{13, 64}_2 ∧  b^{13, 64}_1 ∧  b^{13, 64}_0 ∧ true) 
c  in CNF:
c    -b^{13, 64}_2 ∨ -b^{13, 64}_1 ∨ -b^{13, 64}_0 ∨ false 
c  in DIMACS:
-12185 -12186 -12187  0

c i = 65
c  -2+1 --> -1
c    ( b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧  p_845) -> ( b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0)
c  in CNF:
c    -b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨  b^{13, 66}_2
c    -b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_1
c    -b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨  b^{13, 66}_0
c  in DIMACS:
-12188 -12189  12190 -845  12191 0
-12188 -12189  12190 -845 -12192 0
-12188 -12189  12190 -845  12193 0

c  -1+1 --> 0
c    ( b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0 ∧  p_845) -> (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧ -b^{13, 66}_0)
c  in CNF:
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_2
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_1
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_0
c  in DIMACS:
-12188  12189 -12190 -845 -12191 0
-12188  12189 -12190 -845 -12192 0
-12188  12189 -12190 -845 -12193 0

c  0+1 --> 1
c    (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧  p_845) -> (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0)
c  in CNF:
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_2
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_1
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨  b^{13, 66}_0
c  in DIMACS:
 12188  12189  12190 -845 -12191 0
 12188  12189  12190 -845 -12192 0
 12188  12189  12190 -845  12193 0

c  1+1 --> 2
c    (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0 ∧  p_845) -> (-b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0)
c  in CNF:
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_2
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨  b^{13, 66}_1
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ -p_845 ∨ -b^{13, 66}_0
c  in DIMACS:
 12188  12189 -12190 -845 -12191 0
 12188  12189 -12190 -845  12192 0
 12188  12189 -12190 -845 -12193 0

c  2+1 --> break 
c    (-b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧  p_845) -> break
c  in CNF:
c     b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ -p_845 ∨ break
c  in DIMACS:
 12188 -12189  12190 -845 1162 0


c  2-1 --> 1
c    (-b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧ -p_845) -> (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0)
c  in CNF:
c     b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_2
c     b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_1
c     b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨  b^{13, 66}_0
c  in DIMACS:
 12188 -12189  12190  845 -12191 0
 12188 -12189  12190  845 -12192 0
 12188 -12189  12190  845  12193 0

c  1-1 --> 0
c    (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0 ∧ -p_845) -> (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧ -b^{13, 66}_0)
c  in CNF:
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_2
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_1
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_0
c  in DIMACS:
 12188  12189 -12190  845 -12191 0
 12188  12189 -12190  845 -12192 0
 12188  12189 -12190  845 -12193 0

c  0-1 --> -1
c    (-b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧ -p_845) -> ( b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0)
c  in CNF:
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨  b^{13, 66}_2
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_1
c     b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨  b^{13, 66}_0
c  in DIMACS:
 12188  12189  12190  845  12191 0
 12188  12189  12190  845 -12192 0
 12188  12189  12190  845  12193 0

c  -1-1 --> -2
c    ( b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧  b^{13, 65}_0 ∧ -p_845) -> ( b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0)
c  in CNF:
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨  b^{13, 66}_2
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨  b^{13, 66}_1
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨  p_845 ∨ -b^{13, 66}_0
c  in DIMACS:
-12188  12189 -12190  845  12191 0
-12188  12189 -12190  845  12192 0
-12188  12189 -12190  845 -12193 0

c  -2-1 --> break 
c    ( b^{13, 65}_2 ∧  b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧ -p_845) -> break
c  in CNF:
c    -b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨  b^{13, 65}_0 ∨  p_845 ∨ break
c  in DIMACS:
-12188 -12189  12190  845 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 65}_2 ∧ -b^{13, 65}_1 ∧ -b^{13, 65}_0 ∧ true) 
c  in CNF:
c    -b^{13, 65}_2 ∨  b^{13, 65}_1 ∨  b^{13, 65}_0 ∨ false 
c  in DIMACS:
-12188  12189  12190  0

c  3 does not represent an automaton state.
c    -(-b^{13, 65}_2 ∧  b^{13, 65}_1 ∧  b^{13, 65}_0 ∧ true) 
c  in CNF:
c     b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ false 
c  in DIMACS:
 12188 -12189 -12190  0
c  -3 does not represent an automaton state.
c    -( b^{13, 65}_2 ∧  b^{13, 65}_1 ∧  b^{13, 65}_0 ∧ true) 
c  in CNF:
c    -b^{13, 65}_2 ∨ -b^{13, 65}_1 ∨ -b^{13, 65}_0 ∨ false 
c  in DIMACS:
-12188 -12189 -12190  0

c i = 66
c  -2+1 --> -1
c    ( b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧  p_858) -> ( b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0)
c  in CNF:
c    -b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨  b^{13, 67}_2
c    -b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_1
c    -b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨  b^{13, 67}_0
c  in DIMACS:
-12191 -12192  12193 -858  12194 0
-12191 -12192  12193 -858 -12195 0
-12191 -12192  12193 -858  12196 0

c  -1+1 --> 0
c    ( b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0 ∧  p_858) -> (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧ -b^{13, 67}_0)
c  in CNF:
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_2
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_1
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_0
c  in DIMACS:
-12191  12192 -12193 -858 -12194 0
-12191  12192 -12193 -858 -12195 0
-12191  12192 -12193 -858 -12196 0

c  0+1 --> 1
c    (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧  p_858) -> (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0)
c  in CNF:
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_2
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_1
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨  b^{13, 67}_0
c  in DIMACS:
 12191  12192  12193 -858 -12194 0
 12191  12192  12193 -858 -12195 0
 12191  12192  12193 -858  12196 0

c  1+1 --> 2
c    (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0 ∧  p_858) -> (-b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0)
c  in CNF:
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_2
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨  b^{13, 67}_1
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ -p_858 ∨ -b^{13, 67}_0
c  in DIMACS:
 12191  12192 -12193 -858 -12194 0
 12191  12192 -12193 -858  12195 0
 12191  12192 -12193 -858 -12196 0

c  2+1 --> break 
c    (-b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧  p_858) -> break
c  in CNF:
c     b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 12191 -12192  12193 -858 1162 0


c  2-1 --> 1
c    (-b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧ -p_858) -> (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0)
c  in CNF:
c     b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_2
c     b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_1
c     b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨  b^{13, 67}_0
c  in DIMACS:
 12191 -12192  12193  858 -12194 0
 12191 -12192  12193  858 -12195 0
 12191 -12192  12193  858  12196 0

c  1-1 --> 0
c    (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0 ∧ -p_858) -> (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧ -b^{13, 67}_0)
c  in CNF:
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_2
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_1
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_0
c  in DIMACS:
 12191  12192 -12193  858 -12194 0
 12191  12192 -12193  858 -12195 0
 12191  12192 -12193  858 -12196 0

c  0-1 --> -1
c    (-b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧ -p_858) -> ( b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0)
c  in CNF:
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨  b^{13, 67}_2
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_1
c     b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨  b^{13, 67}_0
c  in DIMACS:
 12191  12192  12193  858  12194 0
 12191  12192  12193  858 -12195 0
 12191  12192  12193  858  12196 0

c  -1-1 --> -2
c    ( b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧  b^{13, 66}_0 ∧ -p_858) -> ( b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0)
c  in CNF:
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨  b^{13, 67}_2
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨  b^{13, 67}_1
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨  p_858 ∨ -b^{13, 67}_0
c  in DIMACS:
-12191  12192 -12193  858  12194 0
-12191  12192 -12193  858  12195 0
-12191  12192 -12193  858 -12196 0

c  -2-1 --> break 
c    ( b^{13, 66}_2 ∧  b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨  b^{13, 66}_0 ∨  p_858 ∨ break
c  in DIMACS:
-12191 -12192  12193  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 66}_2 ∧ -b^{13, 66}_1 ∧ -b^{13, 66}_0 ∧ true) 
c  in CNF:
c    -b^{13, 66}_2 ∨  b^{13, 66}_1 ∨  b^{13, 66}_0 ∨ false 
c  in DIMACS:
-12191  12192  12193  0

c  3 does not represent an automaton state.
c    -(-b^{13, 66}_2 ∧  b^{13, 66}_1 ∧  b^{13, 66}_0 ∧ true) 
c  in CNF:
c     b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ false 
c  in DIMACS:
 12191 -12192 -12193  0
c  -3 does not represent an automaton state.
c    -( b^{13, 66}_2 ∧  b^{13, 66}_1 ∧  b^{13, 66}_0 ∧ true) 
c  in CNF:
c    -b^{13, 66}_2 ∨ -b^{13, 66}_1 ∨ -b^{13, 66}_0 ∨ false 
c  in DIMACS:
-12191 -12192 -12193  0

c i = 67
c  -2+1 --> -1
c    ( b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧  p_871) -> ( b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0)
c  in CNF:
c    -b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨  b^{13, 68}_2
c    -b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_1
c    -b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨  b^{13, 68}_0
c  in DIMACS:
-12194 -12195  12196 -871  12197 0
-12194 -12195  12196 -871 -12198 0
-12194 -12195  12196 -871  12199 0

c  -1+1 --> 0
c    ( b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0 ∧  p_871) -> (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧ -b^{13, 68}_0)
c  in CNF:
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_2
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_1
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_0
c  in DIMACS:
-12194  12195 -12196 -871 -12197 0
-12194  12195 -12196 -871 -12198 0
-12194  12195 -12196 -871 -12199 0

c  0+1 --> 1
c    (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧  p_871) -> (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0)
c  in CNF:
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_2
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_1
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨  b^{13, 68}_0
c  in DIMACS:
 12194  12195  12196 -871 -12197 0
 12194  12195  12196 -871 -12198 0
 12194  12195  12196 -871  12199 0

c  1+1 --> 2
c    (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0 ∧  p_871) -> (-b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0)
c  in CNF:
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_2
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨  b^{13, 68}_1
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ -p_871 ∨ -b^{13, 68}_0
c  in DIMACS:
 12194  12195 -12196 -871 -12197 0
 12194  12195 -12196 -871  12198 0
 12194  12195 -12196 -871 -12199 0

c  2+1 --> break 
c    (-b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧  p_871) -> break
c  in CNF:
c     b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ -p_871 ∨ break
c  in DIMACS:
 12194 -12195  12196 -871 1162 0


c  2-1 --> 1
c    (-b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧ -p_871) -> (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0)
c  in CNF:
c     b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_2
c     b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_1
c     b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨  b^{13, 68}_0
c  in DIMACS:
 12194 -12195  12196  871 -12197 0
 12194 -12195  12196  871 -12198 0
 12194 -12195  12196  871  12199 0

c  1-1 --> 0
c    (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0 ∧ -p_871) -> (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧ -b^{13, 68}_0)
c  in CNF:
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_2
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_1
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_0
c  in DIMACS:
 12194  12195 -12196  871 -12197 0
 12194  12195 -12196  871 -12198 0
 12194  12195 -12196  871 -12199 0

c  0-1 --> -1
c    (-b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧ -p_871) -> ( b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0)
c  in CNF:
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨  b^{13, 68}_2
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_1
c     b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨  b^{13, 68}_0
c  in DIMACS:
 12194  12195  12196  871  12197 0
 12194  12195  12196  871 -12198 0
 12194  12195  12196  871  12199 0

c  -1-1 --> -2
c    ( b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧  b^{13, 67}_0 ∧ -p_871) -> ( b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0)
c  in CNF:
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨  b^{13, 68}_2
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨  b^{13, 68}_1
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨  p_871 ∨ -b^{13, 68}_0
c  in DIMACS:
-12194  12195 -12196  871  12197 0
-12194  12195 -12196  871  12198 0
-12194  12195 -12196  871 -12199 0

c  -2-1 --> break 
c    ( b^{13, 67}_2 ∧  b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧ -p_871) -> break
c  in CNF:
c    -b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨  b^{13, 67}_0 ∨  p_871 ∨ break
c  in DIMACS:
-12194 -12195  12196  871 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 67}_2 ∧ -b^{13, 67}_1 ∧ -b^{13, 67}_0 ∧ true) 
c  in CNF:
c    -b^{13, 67}_2 ∨  b^{13, 67}_1 ∨  b^{13, 67}_0 ∨ false 
c  in DIMACS:
-12194  12195  12196  0

c  3 does not represent an automaton state.
c    -(-b^{13, 67}_2 ∧  b^{13, 67}_1 ∧  b^{13, 67}_0 ∧ true) 
c  in CNF:
c     b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ false 
c  in DIMACS:
 12194 -12195 -12196  0
c  -3 does not represent an automaton state.
c    -( b^{13, 67}_2 ∧  b^{13, 67}_1 ∧  b^{13, 67}_0 ∧ true) 
c  in CNF:
c    -b^{13, 67}_2 ∨ -b^{13, 67}_1 ∨ -b^{13, 67}_0 ∨ false 
c  in DIMACS:
-12194 -12195 -12196  0

c i = 68
c  -2+1 --> -1
c    ( b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧  p_884) -> ( b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0)
c  in CNF:
c    -b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨  b^{13, 69}_2
c    -b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_1
c    -b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨  b^{13, 69}_0
c  in DIMACS:
-12197 -12198  12199 -884  12200 0
-12197 -12198  12199 -884 -12201 0
-12197 -12198  12199 -884  12202 0

c  -1+1 --> 0
c    ( b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0 ∧  p_884) -> (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧ -b^{13, 69}_0)
c  in CNF:
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_2
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_1
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_0
c  in DIMACS:
-12197  12198 -12199 -884 -12200 0
-12197  12198 -12199 -884 -12201 0
-12197  12198 -12199 -884 -12202 0

c  0+1 --> 1
c    (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧  p_884) -> (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0)
c  in CNF:
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_2
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_1
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨  b^{13, 69}_0
c  in DIMACS:
 12197  12198  12199 -884 -12200 0
 12197  12198  12199 -884 -12201 0
 12197  12198  12199 -884  12202 0

c  1+1 --> 2
c    (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0 ∧  p_884) -> (-b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0)
c  in CNF:
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_2
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨  b^{13, 69}_1
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ -p_884 ∨ -b^{13, 69}_0
c  in DIMACS:
 12197  12198 -12199 -884 -12200 0
 12197  12198 -12199 -884  12201 0
 12197  12198 -12199 -884 -12202 0

c  2+1 --> break 
c    (-b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧  p_884) -> break
c  in CNF:
c     b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 12197 -12198  12199 -884 1162 0


c  2-1 --> 1
c    (-b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧ -p_884) -> (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0)
c  in CNF:
c     b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_2
c     b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_1
c     b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨  b^{13, 69}_0
c  in DIMACS:
 12197 -12198  12199  884 -12200 0
 12197 -12198  12199  884 -12201 0
 12197 -12198  12199  884  12202 0

c  1-1 --> 0
c    (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0 ∧ -p_884) -> (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧ -b^{13, 69}_0)
c  in CNF:
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_2
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_1
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_0
c  in DIMACS:
 12197  12198 -12199  884 -12200 0
 12197  12198 -12199  884 -12201 0
 12197  12198 -12199  884 -12202 0

c  0-1 --> -1
c    (-b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧ -p_884) -> ( b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0)
c  in CNF:
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨  b^{13, 69}_2
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_1
c     b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨  b^{13, 69}_0
c  in DIMACS:
 12197  12198  12199  884  12200 0
 12197  12198  12199  884 -12201 0
 12197  12198  12199  884  12202 0

c  -1-1 --> -2
c    ( b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧  b^{13, 68}_0 ∧ -p_884) -> ( b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0)
c  in CNF:
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨  b^{13, 69}_2
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨  b^{13, 69}_1
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨  p_884 ∨ -b^{13, 69}_0
c  in DIMACS:
-12197  12198 -12199  884  12200 0
-12197  12198 -12199  884  12201 0
-12197  12198 -12199  884 -12202 0

c  -2-1 --> break 
c    ( b^{13, 68}_2 ∧  b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨  b^{13, 68}_0 ∨  p_884 ∨ break
c  in DIMACS:
-12197 -12198  12199  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 68}_2 ∧ -b^{13, 68}_1 ∧ -b^{13, 68}_0 ∧ true) 
c  in CNF:
c    -b^{13, 68}_2 ∨  b^{13, 68}_1 ∨  b^{13, 68}_0 ∨ false 
c  in DIMACS:
-12197  12198  12199  0

c  3 does not represent an automaton state.
c    -(-b^{13, 68}_2 ∧  b^{13, 68}_1 ∧  b^{13, 68}_0 ∧ true) 
c  in CNF:
c     b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ false 
c  in DIMACS:
 12197 -12198 -12199  0
c  -3 does not represent an automaton state.
c    -( b^{13, 68}_2 ∧  b^{13, 68}_1 ∧  b^{13, 68}_0 ∧ true) 
c  in CNF:
c    -b^{13, 68}_2 ∨ -b^{13, 68}_1 ∨ -b^{13, 68}_0 ∨ false 
c  in DIMACS:
-12197 -12198 -12199  0

c i = 69
c  -2+1 --> -1
c    ( b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧  p_897) -> ( b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0)
c  in CNF:
c    -b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨  b^{13, 70}_2
c    -b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_1
c    -b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨  b^{13, 70}_0
c  in DIMACS:
-12200 -12201  12202 -897  12203 0
-12200 -12201  12202 -897 -12204 0
-12200 -12201  12202 -897  12205 0

c  -1+1 --> 0
c    ( b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0 ∧  p_897) -> (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧ -b^{13, 70}_0)
c  in CNF:
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_2
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_1
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_0
c  in DIMACS:
-12200  12201 -12202 -897 -12203 0
-12200  12201 -12202 -897 -12204 0
-12200  12201 -12202 -897 -12205 0

c  0+1 --> 1
c    (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧  p_897) -> (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0)
c  in CNF:
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_2
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_1
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨  b^{13, 70}_0
c  in DIMACS:
 12200  12201  12202 -897 -12203 0
 12200  12201  12202 -897 -12204 0
 12200  12201  12202 -897  12205 0

c  1+1 --> 2
c    (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0 ∧  p_897) -> (-b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0)
c  in CNF:
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_2
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨  b^{13, 70}_1
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ -p_897 ∨ -b^{13, 70}_0
c  in DIMACS:
 12200  12201 -12202 -897 -12203 0
 12200  12201 -12202 -897  12204 0
 12200  12201 -12202 -897 -12205 0

c  2+1 --> break 
c    (-b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧  p_897) -> break
c  in CNF:
c     b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 12200 -12201  12202 -897 1162 0


c  2-1 --> 1
c    (-b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧ -p_897) -> (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0)
c  in CNF:
c     b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_2
c     b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_1
c     b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨  b^{13, 70}_0
c  in DIMACS:
 12200 -12201  12202  897 -12203 0
 12200 -12201  12202  897 -12204 0
 12200 -12201  12202  897  12205 0

c  1-1 --> 0
c    (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0 ∧ -p_897) -> (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧ -b^{13, 70}_0)
c  in CNF:
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_2
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_1
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_0
c  in DIMACS:
 12200  12201 -12202  897 -12203 0
 12200  12201 -12202  897 -12204 0
 12200  12201 -12202  897 -12205 0

c  0-1 --> -1
c    (-b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧ -p_897) -> ( b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0)
c  in CNF:
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨  b^{13, 70}_2
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_1
c     b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨  b^{13, 70}_0
c  in DIMACS:
 12200  12201  12202  897  12203 0
 12200  12201  12202  897 -12204 0
 12200  12201  12202  897  12205 0

c  -1-1 --> -2
c    ( b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧  b^{13, 69}_0 ∧ -p_897) -> ( b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0)
c  in CNF:
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨  b^{13, 70}_2
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨  b^{13, 70}_1
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨  p_897 ∨ -b^{13, 70}_0
c  in DIMACS:
-12200  12201 -12202  897  12203 0
-12200  12201 -12202  897  12204 0
-12200  12201 -12202  897 -12205 0

c  -2-1 --> break 
c    ( b^{13, 69}_2 ∧  b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨  b^{13, 69}_0 ∨  p_897 ∨ break
c  in DIMACS:
-12200 -12201  12202  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 69}_2 ∧ -b^{13, 69}_1 ∧ -b^{13, 69}_0 ∧ true) 
c  in CNF:
c    -b^{13, 69}_2 ∨  b^{13, 69}_1 ∨  b^{13, 69}_0 ∨ false 
c  in DIMACS:
-12200  12201  12202  0

c  3 does not represent an automaton state.
c    -(-b^{13, 69}_2 ∧  b^{13, 69}_1 ∧  b^{13, 69}_0 ∧ true) 
c  in CNF:
c     b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ false 
c  in DIMACS:
 12200 -12201 -12202  0
c  -3 does not represent an automaton state.
c    -( b^{13, 69}_2 ∧  b^{13, 69}_1 ∧  b^{13, 69}_0 ∧ true) 
c  in CNF:
c    -b^{13, 69}_2 ∨ -b^{13, 69}_1 ∨ -b^{13, 69}_0 ∨ false 
c  in DIMACS:
-12200 -12201 -12202  0

c i = 70
c  -2+1 --> -1
c    ( b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧  p_910) -> ( b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0)
c  in CNF:
c    -b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨  b^{13, 71}_2
c    -b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_1
c    -b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨  b^{13, 71}_0
c  in DIMACS:
-12203 -12204  12205 -910  12206 0
-12203 -12204  12205 -910 -12207 0
-12203 -12204  12205 -910  12208 0

c  -1+1 --> 0
c    ( b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0 ∧  p_910) -> (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧ -b^{13, 71}_0)
c  in CNF:
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_2
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_1
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_0
c  in DIMACS:
-12203  12204 -12205 -910 -12206 0
-12203  12204 -12205 -910 -12207 0
-12203  12204 -12205 -910 -12208 0

c  0+1 --> 1
c    (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧  p_910) -> (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0)
c  in CNF:
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_2
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_1
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨  b^{13, 71}_0
c  in DIMACS:
 12203  12204  12205 -910 -12206 0
 12203  12204  12205 -910 -12207 0
 12203  12204  12205 -910  12208 0

c  1+1 --> 2
c    (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0 ∧  p_910) -> (-b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0)
c  in CNF:
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_2
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨  b^{13, 71}_1
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ -p_910 ∨ -b^{13, 71}_0
c  in DIMACS:
 12203  12204 -12205 -910 -12206 0
 12203  12204 -12205 -910  12207 0
 12203  12204 -12205 -910 -12208 0

c  2+1 --> break 
c    (-b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧  p_910) -> break
c  in CNF:
c     b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 12203 -12204  12205 -910 1162 0


c  2-1 --> 1
c    (-b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧ -p_910) -> (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0)
c  in CNF:
c     b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_2
c     b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_1
c     b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨  b^{13, 71}_0
c  in DIMACS:
 12203 -12204  12205  910 -12206 0
 12203 -12204  12205  910 -12207 0
 12203 -12204  12205  910  12208 0

c  1-1 --> 0
c    (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0 ∧ -p_910) -> (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧ -b^{13, 71}_0)
c  in CNF:
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_2
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_1
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_0
c  in DIMACS:
 12203  12204 -12205  910 -12206 0
 12203  12204 -12205  910 -12207 0
 12203  12204 -12205  910 -12208 0

c  0-1 --> -1
c    (-b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧ -p_910) -> ( b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0)
c  in CNF:
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨  b^{13, 71}_2
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_1
c     b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨  b^{13, 71}_0
c  in DIMACS:
 12203  12204  12205  910  12206 0
 12203  12204  12205  910 -12207 0
 12203  12204  12205  910  12208 0

c  -1-1 --> -2
c    ( b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧  b^{13, 70}_0 ∧ -p_910) -> ( b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0)
c  in CNF:
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨  b^{13, 71}_2
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨  b^{13, 71}_1
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨  p_910 ∨ -b^{13, 71}_0
c  in DIMACS:
-12203  12204 -12205  910  12206 0
-12203  12204 -12205  910  12207 0
-12203  12204 -12205  910 -12208 0

c  -2-1 --> break 
c    ( b^{13, 70}_2 ∧  b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨  b^{13, 70}_0 ∨  p_910 ∨ break
c  in DIMACS:
-12203 -12204  12205  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 70}_2 ∧ -b^{13, 70}_1 ∧ -b^{13, 70}_0 ∧ true) 
c  in CNF:
c    -b^{13, 70}_2 ∨  b^{13, 70}_1 ∨  b^{13, 70}_0 ∨ false 
c  in DIMACS:
-12203  12204  12205  0

c  3 does not represent an automaton state.
c    -(-b^{13, 70}_2 ∧  b^{13, 70}_1 ∧  b^{13, 70}_0 ∧ true) 
c  in CNF:
c     b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ false 
c  in DIMACS:
 12203 -12204 -12205  0
c  -3 does not represent an automaton state.
c    -( b^{13, 70}_2 ∧  b^{13, 70}_1 ∧  b^{13, 70}_0 ∧ true) 
c  in CNF:
c    -b^{13, 70}_2 ∨ -b^{13, 70}_1 ∨ -b^{13, 70}_0 ∨ false 
c  in DIMACS:
-12203 -12204 -12205  0

c i = 71
c  -2+1 --> -1
c    ( b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧  p_923) -> ( b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0)
c  in CNF:
c    -b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨  b^{13, 72}_2
c    -b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_1
c    -b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨  b^{13, 72}_0
c  in DIMACS:
-12206 -12207  12208 -923  12209 0
-12206 -12207  12208 -923 -12210 0
-12206 -12207  12208 -923  12211 0

c  -1+1 --> 0
c    ( b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0 ∧  p_923) -> (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧ -b^{13, 72}_0)
c  in CNF:
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_2
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_1
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_0
c  in DIMACS:
-12206  12207 -12208 -923 -12209 0
-12206  12207 -12208 -923 -12210 0
-12206  12207 -12208 -923 -12211 0

c  0+1 --> 1
c    (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧  p_923) -> (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0)
c  in CNF:
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_2
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_1
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨  b^{13, 72}_0
c  in DIMACS:
 12206  12207  12208 -923 -12209 0
 12206  12207  12208 -923 -12210 0
 12206  12207  12208 -923  12211 0

c  1+1 --> 2
c    (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0 ∧  p_923) -> (-b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0)
c  in CNF:
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_2
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨  b^{13, 72}_1
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ -p_923 ∨ -b^{13, 72}_0
c  in DIMACS:
 12206  12207 -12208 -923 -12209 0
 12206  12207 -12208 -923  12210 0
 12206  12207 -12208 -923 -12211 0

c  2+1 --> break 
c    (-b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧  p_923) -> break
c  in CNF:
c     b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ -p_923 ∨ break
c  in DIMACS:
 12206 -12207  12208 -923 1162 0


c  2-1 --> 1
c    (-b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧ -p_923) -> (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0)
c  in CNF:
c     b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_2
c     b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_1
c     b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨  b^{13, 72}_0
c  in DIMACS:
 12206 -12207  12208  923 -12209 0
 12206 -12207  12208  923 -12210 0
 12206 -12207  12208  923  12211 0

c  1-1 --> 0
c    (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0 ∧ -p_923) -> (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧ -b^{13, 72}_0)
c  in CNF:
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_2
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_1
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_0
c  in DIMACS:
 12206  12207 -12208  923 -12209 0
 12206  12207 -12208  923 -12210 0
 12206  12207 -12208  923 -12211 0

c  0-1 --> -1
c    (-b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧ -p_923) -> ( b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0)
c  in CNF:
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨  b^{13, 72}_2
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_1
c     b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨  b^{13, 72}_0
c  in DIMACS:
 12206  12207  12208  923  12209 0
 12206  12207  12208  923 -12210 0
 12206  12207  12208  923  12211 0

c  -1-1 --> -2
c    ( b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧  b^{13, 71}_0 ∧ -p_923) -> ( b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0)
c  in CNF:
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨  b^{13, 72}_2
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨  b^{13, 72}_1
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨  p_923 ∨ -b^{13, 72}_0
c  in DIMACS:
-12206  12207 -12208  923  12209 0
-12206  12207 -12208  923  12210 0
-12206  12207 -12208  923 -12211 0

c  -2-1 --> break 
c    ( b^{13, 71}_2 ∧  b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧ -p_923) -> break
c  in CNF:
c    -b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨  b^{13, 71}_0 ∨  p_923 ∨ break
c  in DIMACS:
-12206 -12207  12208  923 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 71}_2 ∧ -b^{13, 71}_1 ∧ -b^{13, 71}_0 ∧ true) 
c  in CNF:
c    -b^{13, 71}_2 ∨  b^{13, 71}_1 ∨  b^{13, 71}_0 ∨ false 
c  in DIMACS:
-12206  12207  12208  0

c  3 does not represent an automaton state.
c    -(-b^{13, 71}_2 ∧  b^{13, 71}_1 ∧  b^{13, 71}_0 ∧ true) 
c  in CNF:
c     b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ false 
c  in DIMACS:
 12206 -12207 -12208  0
c  -3 does not represent an automaton state.
c    -( b^{13, 71}_2 ∧  b^{13, 71}_1 ∧  b^{13, 71}_0 ∧ true) 
c  in CNF:
c    -b^{13, 71}_2 ∨ -b^{13, 71}_1 ∨ -b^{13, 71}_0 ∨ false 
c  in DIMACS:
-12206 -12207 -12208  0

c i = 72
c  -2+1 --> -1
c    ( b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧  p_936) -> ( b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0)
c  in CNF:
c    -b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨  b^{13, 73}_2
c    -b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_1
c    -b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨  b^{13, 73}_0
c  in DIMACS:
-12209 -12210  12211 -936  12212 0
-12209 -12210  12211 -936 -12213 0
-12209 -12210  12211 -936  12214 0

c  -1+1 --> 0
c    ( b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0 ∧  p_936) -> (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧ -b^{13, 73}_0)
c  in CNF:
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_2
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_1
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_0
c  in DIMACS:
-12209  12210 -12211 -936 -12212 0
-12209  12210 -12211 -936 -12213 0
-12209  12210 -12211 -936 -12214 0

c  0+1 --> 1
c    (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧  p_936) -> (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0)
c  in CNF:
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_2
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_1
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨  b^{13, 73}_0
c  in DIMACS:
 12209  12210  12211 -936 -12212 0
 12209  12210  12211 -936 -12213 0
 12209  12210  12211 -936  12214 0

c  1+1 --> 2
c    (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0 ∧  p_936) -> (-b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0)
c  in CNF:
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_2
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨  b^{13, 73}_1
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ -p_936 ∨ -b^{13, 73}_0
c  in DIMACS:
 12209  12210 -12211 -936 -12212 0
 12209  12210 -12211 -936  12213 0
 12209  12210 -12211 -936 -12214 0

c  2+1 --> break 
c    (-b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧  p_936) -> break
c  in CNF:
c     b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 12209 -12210  12211 -936 1162 0


c  2-1 --> 1
c    (-b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧ -p_936) -> (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0)
c  in CNF:
c     b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_2
c     b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_1
c     b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨  b^{13, 73}_0
c  in DIMACS:
 12209 -12210  12211  936 -12212 0
 12209 -12210  12211  936 -12213 0
 12209 -12210  12211  936  12214 0

c  1-1 --> 0
c    (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0 ∧ -p_936) -> (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧ -b^{13, 73}_0)
c  in CNF:
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_2
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_1
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_0
c  in DIMACS:
 12209  12210 -12211  936 -12212 0
 12209  12210 -12211  936 -12213 0
 12209  12210 -12211  936 -12214 0

c  0-1 --> -1
c    (-b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧ -p_936) -> ( b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0)
c  in CNF:
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨  b^{13, 73}_2
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_1
c     b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨  b^{13, 73}_0
c  in DIMACS:
 12209  12210  12211  936  12212 0
 12209  12210  12211  936 -12213 0
 12209  12210  12211  936  12214 0

c  -1-1 --> -2
c    ( b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧  b^{13, 72}_0 ∧ -p_936) -> ( b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0)
c  in CNF:
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨  b^{13, 73}_2
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨  b^{13, 73}_1
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨  p_936 ∨ -b^{13, 73}_0
c  in DIMACS:
-12209  12210 -12211  936  12212 0
-12209  12210 -12211  936  12213 0
-12209  12210 -12211  936 -12214 0

c  -2-1 --> break 
c    ( b^{13, 72}_2 ∧  b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨  b^{13, 72}_0 ∨  p_936 ∨ break
c  in DIMACS:
-12209 -12210  12211  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 72}_2 ∧ -b^{13, 72}_1 ∧ -b^{13, 72}_0 ∧ true) 
c  in CNF:
c    -b^{13, 72}_2 ∨  b^{13, 72}_1 ∨  b^{13, 72}_0 ∨ false 
c  in DIMACS:
-12209  12210  12211  0

c  3 does not represent an automaton state.
c    -(-b^{13, 72}_2 ∧  b^{13, 72}_1 ∧  b^{13, 72}_0 ∧ true) 
c  in CNF:
c     b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ false 
c  in DIMACS:
 12209 -12210 -12211  0
c  -3 does not represent an automaton state.
c    -( b^{13, 72}_2 ∧  b^{13, 72}_1 ∧  b^{13, 72}_0 ∧ true) 
c  in CNF:
c    -b^{13, 72}_2 ∨ -b^{13, 72}_1 ∨ -b^{13, 72}_0 ∨ false 
c  in DIMACS:
-12209 -12210 -12211  0

c i = 73
c  -2+1 --> -1
c    ( b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧  p_949) -> ( b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0)
c  in CNF:
c    -b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨  b^{13, 74}_2
c    -b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_1
c    -b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨  b^{13, 74}_0
c  in DIMACS:
-12212 -12213  12214 -949  12215 0
-12212 -12213  12214 -949 -12216 0
-12212 -12213  12214 -949  12217 0

c  -1+1 --> 0
c    ( b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0 ∧  p_949) -> (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧ -b^{13, 74}_0)
c  in CNF:
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_2
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_1
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_0
c  in DIMACS:
-12212  12213 -12214 -949 -12215 0
-12212  12213 -12214 -949 -12216 0
-12212  12213 -12214 -949 -12217 0

c  0+1 --> 1
c    (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧  p_949) -> (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0)
c  in CNF:
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_2
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_1
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨  b^{13, 74}_0
c  in DIMACS:
 12212  12213  12214 -949 -12215 0
 12212  12213  12214 -949 -12216 0
 12212  12213  12214 -949  12217 0

c  1+1 --> 2
c    (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0 ∧  p_949) -> (-b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0)
c  in CNF:
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_2
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨  b^{13, 74}_1
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ -p_949 ∨ -b^{13, 74}_0
c  in DIMACS:
 12212  12213 -12214 -949 -12215 0
 12212  12213 -12214 -949  12216 0
 12212  12213 -12214 -949 -12217 0

c  2+1 --> break 
c    (-b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧  p_949) -> break
c  in CNF:
c     b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ -p_949 ∨ break
c  in DIMACS:
 12212 -12213  12214 -949 1162 0


c  2-1 --> 1
c    (-b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧ -p_949) -> (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0)
c  in CNF:
c     b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_2
c     b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_1
c     b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨  b^{13, 74}_0
c  in DIMACS:
 12212 -12213  12214  949 -12215 0
 12212 -12213  12214  949 -12216 0
 12212 -12213  12214  949  12217 0

c  1-1 --> 0
c    (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0 ∧ -p_949) -> (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧ -b^{13, 74}_0)
c  in CNF:
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_2
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_1
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_0
c  in DIMACS:
 12212  12213 -12214  949 -12215 0
 12212  12213 -12214  949 -12216 0
 12212  12213 -12214  949 -12217 0

c  0-1 --> -1
c    (-b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧ -p_949) -> ( b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0)
c  in CNF:
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨  b^{13, 74}_2
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_1
c     b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨  b^{13, 74}_0
c  in DIMACS:
 12212  12213  12214  949  12215 0
 12212  12213  12214  949 -12216 0
 12212  12213  12214  949  12217 0

c  -1-1 --> -2
c    ( b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧  b^{13, 73}_0 ∧ -p_949) -> ( b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0)
c  in CNF:
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨  b^{13, 74}_2
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨  b^{13, 74}_1
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨  p_949 ∨ -b^{13, 74}_0
c  in DIMACS:
-12212  12213 -12214  949  12215 0
-12212  12213 -12214  949  12216 0
-12212  12213 -12214  949 -12217 0

c  -2-1 --> break 
c    ( b^{13, 73}_2 ∧  b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧ -p_949) -> break
c  in CNF:
c    -b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨  b^{13, 73}_0 ∨  p_949 ∨ break
c  in DIMACS:
-12212 -12213  12214  949 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 73}_2 ∧ -b^{13, 73}_1 ∧ -b^{13, 73}_0 ∧ true) 
c  in CNF:
c    -b^{13, 73}_2 ∨  b^{13, 73}_1 ∨  b^{13, 73}_0 ∨ false 
c  in DIMACS:
-12212  12213  12214  0

c  3 does not represent an automaton state.
c    -(-b^{13, 73}_2 ∧  b^{13, 73}_1 ∧  b^{13, 73}_0 ∧ true) 
c  in CNF:
c     b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ false 
c  in DIMACS:
 12212 -12213 -12214  0
c  -3 does not represent an automaton state.
c    -( b^{13, 73}_2 ∧  b^{13, 73}_1 ∧  b^{13, 73}_0 ∧ true) 
c  in CNF:
c    -b^{13, 73}_2 ∨ -b^{13, 73}_1 ∨ -b^{13, 73}_0 ∨ false 
c  in DIMACS:
-12212 -12213 -12214  0

c i = 74
c  -2+1 --> -1
c    ( b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧  p_962) -> ( b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0)
c  in CNF:
c    -b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨  b^{13, 75}_2
c    -b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_1
c    -b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨  b^{13, 75}_0
c  in DIMACS:
-12215 -12216  12217 -962  12218 0
-12215 -12216  12217 -962 -12219 0
-12215 -12216  12217 -962  12220 0

c  -1+1 --> 0
c    ( b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0 ∧  p_962) -> (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧ -b^{13, 75}_0)
c  in CNF:
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_2
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_1
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_0
c  in DIMACS:
-12215  12216 -12217 -962 -12218 0
-12215  12216 -12217 -962 -12219 0
-12215  12216 -12217 -962 -12220 0

c  0+1 --> 1
c    (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧  p_962) -> (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0)
c  in CNF:
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_2
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_1
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨  b^{13, 75}_0
c  in DIMACS:
 12215  12216  12217 -962 -12218 0
 12215  12216  12217 -962 -12219 0
 12215  12216  12217 -962  12220 0

c  1+1 --> 2
c    (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0 ∧  p_962) -> (-b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0)
c  in CNF:
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_2
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨  b^{13, 75}_1
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ -p_962 ∨ -b^{13, 75}_0
c  in DIMACS:
 12215  12216 -12217 -962 -12218 0
 12215  12216 -12217 -962  12219 0
 12215  12216 -12217 -962 -12220 0

c  2+1 --> break 
c    (-b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧  p_962) -> break
c  in CNF:
c     b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 12215 -12216  12217 -962 1162 0


c  2-1 --> 1
c    (-b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧ -p_962) -> (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0)
c  in CNF:
c     b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_2
c     b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_1
c     b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨  b^{13, 75}_0
c  in DIMACS:
 12215 -12216  12217  962 -12218 0
 12215 -12216  12217  962 -12219 0
 12215 -12216  12217  962  12220 0

c  1-1 --> 0
c    (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0 ∧ -p_962) -> (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧ -b^{13, 75}_0)
c  in CNF:
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_2
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_1
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_0
c  in DIMACS:
 12215  12216 -12217  962 -12218 0
 12215  12216 -12217  962 -12219 0
 12215  12216 -12217  962 -12220 0

c  0-1 --> -1
c    (-b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧ -p_962) -> ( b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0)
c  in CNF:
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨  b^{13, 75}_2
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_1
c     b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨  b^{13, 75}_0
c  in DIMACS:
 12215  12216  12217  962  12218 0
 12215  12216  12217  962 -12219 0
 12215  12216  12217  962  12220 0

c  -1-1 --> -2
c    ( b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧  b^{13, 74}_0 ∧ -p_962) -> ( b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0)
c  in CNF:
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨  b^{13, 75}_2
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨  b^{13, 75}_1
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨  p_962 ∨ -b^{13, 75}_0
c  in DIMACS:
-12215  12216 -12217  962  12218 0
-12215  12216 -12217  962  12219 0
-12215  12216 -12217  962 -12220 0

c  -2-1 --> break 
c    ( b^{13, 74}_2 ∧  b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨  b^{13, 74}_0 ∨  p_962 ∨ break
c  in DIMACS:
-12215 -12216  12217  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 74}_2 ∧ -b^{13, 74}_1 ∧ -b^{13, 74}_0 ∧ true) 
c  in CNF:
c    -b^{13, 74}_2 ∨  b^{13, 74}_1 ∨  b^{13, 74}_0 ∨ false 
c  in DIMACS:
-12215  12216  12217  0

c  3 does not represent an automaton state.
c    -(-b^{13, 74}_2 ∧  b^{13, 74}_1 ∧  b^{13, 74}_0 ∧ true) 
c  in CNF:
c     b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ false 
c  in DIMACS:
 12215 -12216 -12217  0
c  -3 does not represent an automaton state.
c    -( b^{13, 74}_2 ∧  b^{13, 74}_1 ∧  b^{13, 74}_0 ∧ true) 
c  in CNF:
c    -b^{13, 74}_2 ∨ -b^{13, 74}_1 ∨ -b^{13, 74}_0 ∨ false 
c  in DIMACS:
-12215 -12216 -12217  0

c i = 75
c  -2+1 --> -1
c    ( b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧  p_975) -> ( b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0)
c  in CNF:
c    -b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨  b^{13, 76}_2
c    -b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_1
c    -b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨  b^{13, 76}_0
c  in DIMACS:
-12218 -12219  12220 -975  12221 0
-12218 -12219  12220 -975 -12222 0
-12218 -12219  12220 -975  12223 0

c  -1+1 --> 0
c    ( b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0 ∧  p_975) -> (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧ -b^{13, 76}_0)
c  in CNF:
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_2
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_1
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_0
c  in DIMACS:
-12218  12219 -12220 -975 -12221 0
-12218  12219 -12220 -975 -12222 0
-12218  12219 -12220 -975 -12223 0

c  0+1 --> 1
c    (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧  p_975) -> (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0)
c  in CNF:
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_2
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_1
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨  b^{13, 76}_0
c  in DIMACS:
 12218  12219  12220 -975 -12221 0
 12218  12219  12220 -975 -12222 0
 12218  12219  12220 -975  12223 0

c  1+1 --> 2
c    (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0 ∧  p_975) -> (-b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0)
c  in CNF:
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_2
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨  b^{13, 76}_1
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ -p_975 ∨ -b^{13, 76}_0
c  in DIMACS:
 12218  12219 -12220 -975 -12221 0
 12218  12219 -12220 -975  12222 0
 12218  12219 -12220 -975 -12223 0

c  2+1 --> break 
c    (-b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧  p_975) -> break
c  in CNF:
c     b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 12218 -12219  12220 -975 1162 0


c  2-1 --> 1
c    (-b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧ -p_975) -> (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0)
c  in CNF:
c     b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_2
c     b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_1
c     b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨  b^{13, 76}_0
c  in DIMACS:
 12218 -12219  12220  975 -12221 0
 12218 -12219  12220  975 -12222 0
 12218 -12219  12220  975  12223 0

c  1-1 --> 0
c    (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0 ∧ -p_975) -> (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧ -b^{13, 76}_0)
c  in CNF:
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_2
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_1
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_0
c  in DIMACS:
 12218  12219 -12220  975 -12221 0
 12218  12219 -12220  975 -12222 0
 12218  12219 -12220  975 -12223 0

c  0-1 --> -1
c    (-b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧ -p_975) -> ( b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0)
c  in CNF:
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨  b^{13, 76}_2
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_1
c     b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨  b^{13, 76}_0
c  in DIMACS:
 12218  12219  12220  975  12221 0
 12218  12219  12220  975 -12222 0
 12218  12219  12220  975  12223 0

c  -1-1 --> -2
c    ( b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧  b^{13, 75}_0 ∧ -p_975) -> ( b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0)
c  in CNF:
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨  b^{13, 76}_2
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨  b^{13, 76}_1
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨  p_975 ∨ -b^{13, 76}_0
c  in DIMACS:
-12218  12219 -12220  975  12221 0
-12218  12219 -12220  975  12222 0
-12218  12219 -12220  975 -12223 0

c  -2-1 --> break 
c    ( b^{13, 75}_2 ∧  b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨  b^{13, 75}_0 ∨  p_975 ∨ break
c  in DIMACS:
-12218 -12219  12220  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 75}_2 ∧ -b^{13, 75}_1 ∧ -b^{13, 75}_0 ∧ true) 
c  in CNF:
c    -b^{13, 75}_2 ∨  b^{13, 75}_1 ∨  b^{13, 75}_0 ∨ false 
c  in DIMACS:
-12218  12219  12220  0

c  3 does not represent an automaton state.
c    -(-b^{13, 75}_2 ∧  b^{13, 75}_1 ∧  b^{13, 75}_0 ∧ true) 
c  in CNF:
c     b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ false 
c  in DIMACS:
 12218 -12219 -12220  0
c  -3 does not represent an automaton state.
c    -( b^{13, 75}_2 ∧  b^{13, 75}_1 ∧  b^{13, 75}_0 ∧ true) 
c  in CNF:
c    -b^{13, 75}_2 ∨ -b^{13, 75}_1 ∨ -b^{13, 75}_0 ∨ false 
c  in DIMACS:
-12218 -12219 -12220  0

c i = 76
c  -2+1 --> -1
c    ( b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧  p_988) -> ( b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0)
c  in CNF:
c    -b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨  b^{13, 77}_2
c    -b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_1
c    -b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨  b^{13, 77}_0
c  in DIMACS:
-12221 -12222  12223 -988  12224 0
-12221 -12222  12223 -988 -12225 0
-12221 -12222  12223 -988  12226 0

c  -1+1 --> 0
c    ( b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0 ∧  p_988) -> (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧ -b^{13, 77}_0)
c  in CNF:
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_2
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_1
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_0
c  in DIMACS:
-12221  12222 -12223 -988 -12224 0
-12221  12222 -12223 -988 -12225 0
-12221  12222 -12223 -988 -12226 0

c  0+1 --> 1
c    (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧  p_988) -> (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0)
c  in CNF:
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_2
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_1
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨  b^{13, 77}_0
c  in DIMACS:
 12221  12222  12223 -988 -12224 0
 12221  12222  12223 -988 -12225 0
 12221  12222  12223 -988  12226 0

c  1+1 --> 2
c    (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0 ∧  p_988) -> (-b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0)
c  in CNF:
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_2
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨  b^{13, 77}_1
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ -p_988 ∨ -b^{13, 77}_0
c  in DIMACS:
 12221  12222 -12223 -988 -12224 0
 12221  12222 -12223 -988  12225 0
 12221  12222 -12223 -988 -12226 0

c  2+1 --> break 
c    (-b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧  p_988) -> break
c  in CNF:
c     b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 12221 -12222  12223 -988 1162 0


c  2-1 --> 1
c    (-b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧ -p_988) -> (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0)
c  in CNF:
c     b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_2
c     b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_1
c     b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨  b^{13, 77}_0
c  in DIMACS:
 12221 -12222  12223  988 -12224 0
 12221 -12222  12223  988 -12225 0
 12221 -12222  12223  988  12226 0

c  1-1 --> 0
c    (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0 ∧ -p_988) -> (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧ -b^{13, 77}_0)
c  in CNF:
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_2
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_1
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_0
c  in DIMACS:
 12221  12222 -12223  988 -12224 0
 12221  12222 -12223  988 -12225 0
 12221  12222 -12223  988 -12226 0

c  0-1 --> -1
c    (-b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧ -p_988) -> ( b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0)
c  in CNF:
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨  b^{13, 77}_2
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_1
c     b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨  b^{13, 77}_0
c  in DIMACS:
 12221  12222  12223  988  12224 0
 12221  12222  12223  988 -12225 0
 12221  12222  12223  988  12226 0

c  -1-1 --> -2
c    ( b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧  b^{13, 76}_0 ∧ -p_988) -> ( b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0)
c  in CNF:
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨  b^{13, 77}_2
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨  b^{13, 77}_1
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨  p_988 ∨ -b^{13, 77}_0
c  in DIMACS:
-12221  12222 -12223  988  12224 0
-12221  12222 -12223  988  12225 0
-12221  12222 -12223  988 -12226 0

c  -2-1 --> break 
c    ( b^{13, 76}_2 ∧  b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨  b^{13, 76}_0 ∨  p_988 ∨ break
c  in DIMACS:
-12221 -12222  12223  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 76}_2 ∧ -b^{13, 76}_1 ∧ -b^{13, 76}_0 ∧ true) 
c  in CNF:
c    -b^{13, 76}_2 ∨  b^{13, 76}_1 ∨  b^{13, 76}_0 ∨ false 
c  in DIMACS:
-12221  12222  12223  0

c  3 does not represent an automaton state.
c    -(-b^{13, 76}_2 ∧  b^{13, 76}_1 ∧  b^{13, 76}_0 ∧ true) 
c  in CNF:
c     b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ false 
c  in DIMACS:
 12221 -12222 -12223  0
c  -3 does not represent an automaton state.
c    -( b^{13, 76}_2 ∧  b^{13, 76}_1 ∧  b^{13, 76}_0 ∧ true) 
c  in CNF:
c    -b^{13, 76}_2 ∨ -b^{13, 76}_1 ∨ -b^{13, 76}_0 ∨ false 
c  in DIMACS:
-12221 -12222 -12223  0

c i = 77
c  -2+1 --> -1
c    ( b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧  p_1001) -> ( b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0)
c  in CNF:
c    -b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨  b^{13, 78}_2
c    -b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_1
c    -b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨  b^{13, 78}_0
c  in DIMACS:
-12224 -12225  12226 -1001  12227 0
-12224 -12225  12226 -1001 -12228 0
-12224 -12225  12226 -1001  12229 0

c  -1+1 --> 0
c    ( b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0 ∧  p_1001) -> (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧ -b^{13, 78}_0)
c  in CNF:
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_2
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_1
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_0
c  in DIMACS:
-12224  12225 -12226 -1001 -12227 0
-12224  12225 -12226 -1001 -12228 0
-12224  12225 -12226 -1001 -12229 0

c  0+1 --> 1
c    (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧  p_1001) -> (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0)
c  in CNF:
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_2
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_1
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨  b^{13, 78}_0
c  in DIMACS:
 12224  12225  12226 -1001 -12227 0
 12224  12225  12226 -1001 -12228 0
 12224  12225  12226 -1001  12229 0

c  1+1 --> 2
c    (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0 ∧  p_1001) -> (-b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0)
c  in CNF:
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_2
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨  b^{13, 78}_1
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ -p_1001 ∨ -b^{13, 78}_0
c  in DIMACS:
 12224  12225 -12226 -1001 -12227 0
 12224  12225 -12226 -1001  12228 0
 12224  12225 -12226 -1001 -12229 0

c  2+1 --> break 
c    (-b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 12224 -12225  12226 -1001 1162 0


c  2-1 --> 1
c    (-b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧ -p_1001) -> (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0)
c  in CNF:
c     b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_2
c     b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_1
c     b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨  b^{13, 78}_0
c  in DIMACS:
 12224 -12225  12226  1001 -12227 0
 12224 -12225  12226  1001 -12228 0
 12224 -12225  12226  1001  12229 0

c  1-1 --> 0
c    (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0 ∧ -p_1001) -> (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧ -b^{13, 78}_0)
c  in CNF:
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_2
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_1
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_0
c  in DIMACS:
 12224  12225 -12226  1001 -12227 0
 12224  12225 -12226  1001 -12228 0
 12224  12225 -12226  1001 -12229 0

c  0-1 --> -1
c    (-b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧ -p_1001) -> ( b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0)
c  in CNF:
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨  b^{13, 78}_2
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_1
c     b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨  b^{13, 78}_0
c  in DIMACS:
 12224  12225  12226  1001  12227 0
 12224  12225  12226  1001 -12228 0
 12224  12225  12226  1001  12229 0

c  -1-1 --> -2
c    ( b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧  b^{13, 77}_0 ∧ -p_1001) -> ( b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0)
c  in CNF:
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨  b^{13, 78}_2
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨  b^{13, 78}_1
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨  p_1001 ∨ -b^{13, 78}_0
c  in DIMACS:
-12224  12225 -12226  1001  12227 0
-12224  12225 -12226  1001  12228 0
-12224  12225 -12226  1001 -12229 0

c  -2-1 --> break 
c    ( b^{13, 77}_2 ∧  b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨  b^{13, 77}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-12224 -12225  12226  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 77}_2 ∧ -b^{13, 77}_1 ∧ -b^{13, 77}_0 ∧ true) 
c  in CNF:
c    -b^{13, 77}_2 ∨  b^{13, 77}_1 ∨  b^{13, 77}_0 ∨ false 
c  in DIMACS:
-12224  12225  12226  0

c  3 does not represent an automaton state.
c    -(-b^{13, 77}_2 ∧  b^{13, 77}_1 ∧  b^{13, 77}_0 ∧ true) 
c  in CNF:
c     b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ false 
c  in DIMACS:
 12224 -12225 -12226  0
c  -3 does not represent an automaton state.
c    -( b^{13, 77}_2 ∧  b^{13, 77}_1 ∧  b^{13, 77}_0 ∧ true) 
c  in CNF:
c    -b^{13, 77}_2 ∨ -b^{13, 77}_1 ∨ -b^{13, 77}_0 ∨ false 
c  in DIMACS:
-12224 -12225 -12226  0

c i = 78
c  -2+1 --> -1
c    ( b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧  p_1014) -> ( b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0)
c  in CNF:
c    -b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨  b^{13, 79}_2
c    -b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_1
c    -b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨  b^{13, 79}_0
c  in DIMACS:
-12227 -12228  12229 -1014  12230 0
-12227 -12228  12229 -1014 -12231 0
-12227 -12228  12229 -1014  12232 0

c  -1+1 --> 0
c    ( b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0 ∧  p_1014) -> (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧ -b^{13, 79}_0)
c  in CNF:
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_2
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_1
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_0
c  in DIMACS:
-12227  12228 -12229 -1014 -12230 0
-12227  12228 -12229 -1014 -12231 0
-12227  12228 -12229 -1014 -12232 0

c  0+1 --> 1
c    (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧  p_1014) -> (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0)
c  in CNF:
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_2
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_1
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨  b^{13, 79}_0
c  in DIMACS:
 12227  12228  12229 -1014 -12230 0
 12227  12228  12229 -1014 -12231 0
 12227  12228  12229 -1014  12232 0

c  1+1 --> 2
c    (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0 ∧  p_1014) -> (-b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0)
c  in CNF:
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_2
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨  b^{13, 79}_1
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ -p_1014 ∨ -b^{13, 79}_0
c  in DIMACS:
 12227  12228 -12229 -1014 -12230 0
 12227  12228 -12229 -1014  12231 0
 12227  12228 -12229 -1014 -12232 0

c  2+1 --> break 
c    (-b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 12227 -12228  12229 -1014 1162 0


c  2-1 --> 1
c    (-b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧ -p_1014) -> (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0)
c  in CNF:
c     b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_2
c     b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_1
c     b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨  b^{13, 79}_0
c  in DIMACS:
 12227 -12228  12229  1014 -12230 0
 12227 -12228  12229  1014 -12231 0
 12227 -12228  12229  1014  12232 0

c  1-1 --> 0
c    (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0 ∧ -p_1014) -> (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧ -b^{13, 79}_0)
c  in CNF:
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_2
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_1
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_0
c  in DIMACS:
 12227  12228 -12229  1014 -12230 0
 12227  12228 -12229  1014 -12231 0
 12227  12228 -12229  1014 -12232 0

c  0-1 --> -1
c    (-b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧ -p_1014) -> ( b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0)
c  in CNF:
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨  b^{13, 79}_2
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_1
c     b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨  b^{13, 79}_0
c  in DIMACS:
 12227  12228  12229  1014  12230 0
 12227  12228  12229  1014 -12231 0
 12227  12228  12229  1014  12232 0

c  -1-1 --> -2
c    ( b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧  b^{13, 78}_0 ∧ -p_1014) -> ( b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0)
c  in CNF:
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨  b^{13, 79}_2
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨  b^{13, 79}_1
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨  p_1014 ∨ -b^{13, 79}_0
c  in DIMACS:
-12227  12228 -12229  1014  12230 0
-12227  12228 -12229  1014  12231 0
-12227  12228 -12229  1014 -12232 0

c  -2-1 --> break 
c    ( b^{13, 78}_2 ∧  b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨  b^{13, 78}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-12227 -12228  12229  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 78}_2 ∧ -b^{13, 78}_1 ∧ -b^{13, 78}_0 ∧ true) 
c  in CNF:
c    -b^{13, 78}_2 ∨  b^{13, 78}_1 ∨  b^{13, 78}_0 ∨ false 
c  in DIMACS:
-12227  12228  12229  0

c  3 does not represent an automaton state.
c    -(-b^{13, 78}_2 ∧  b^{13, 78}_1 ∧  b^{13, 78}_0 ∧ true) 
c  in CNF:
c     b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ false 
c  in DIMACS:
 12227 -12228 -12229  0
c  -3 does not represent an automaton state.
c    -( b^{13, 78}_2 ∧  b^{13, 78}_1 ∧  b^{13, 78}_0 ∧ true) 
c  in CNF:
c    -b^{13, 78}_2 ∨ -b^{13, 78}_1 ∨ -b^{13, 78}_0 ∨ false 
c  in DIMACS:
-12227 -12228 -12229  0

c i = 79
c  -2+1 --> -1
c    ( b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧  p_1027) -> ( b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0)
c  in CNF:
c    -b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨  b^{13, 80}_2
c    -b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_1
c    -b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨  b^{13, 80}_0
c  in DIMACS:
-12230 -12231  12232 -1027  12233 0
-12230 -12231  12232 -1027 -12234 0
-12230 -12231  12232 -1027  12235 0

c  -1+1 --> 0
c    ( b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0 ∧  p_1027) -> (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧ -b^{13, 80}_0)
c  in CNF:
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_2
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_1
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_0
c  in DIMACS:
-12230  12231 -12232 -1027 -12233 0
-12230  12231 -12232 -1027 -12234 0
-12230  12231 -12232 -1027 -12235 0

c  0+1 --> 1
c    (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧  p_1027) -> (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0)
c  in CNF:
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_2
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_1
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨  b^{13, 80}_0
c  in DIMACS:
 12230  12231  12232 -1027 -12233 0
 12230  12231  12232 -1027 -12234 0
 12230  12231  12232 -1027  12235 0

c  1+1 --> 2
c    (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0 ∧  p_1027) -> (-b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0)
c  in CNF:
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_2
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨  b^{13, 80}_1
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ -p_1027 ∨ -b^{13, 80}_0
c  in DIMACS:
 12230  12231 -12232 -1027 -12233 0
 12230  12231 -12232 -1027  12234 0
 12230  12231 -12232 -1027 -12235 0

c  2+1 --> break 
c    (-b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧  p_1027) -> break
c  in CNF:
c     b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ -p_1027 ∨ break
c  in DIMACS:
 12230 -12231  12232 -1027 1162 0


c  2-1 --> 1
c    (-b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧ -p_1027) -> (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0)
c  in CNF:
c     b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_2
c     b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_1
c     b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨  b^{13, 80}_0
c  in DIMACS:
 12230 -12231  12232  1027 -12233 0
 12230 -12231  12232  1027 -12234 0
 12230 -12231  12232  1027  12235 0

c  1-1 --> 0
c    (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0 ∧ -p_1027) -> (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧ -b^{13, 80}_0)
c  in CNF:
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_2
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_1
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_0
c  in DIMACS:
 12230  12231 -12232  1027 -12233 0
 12230  12231 -12232  1027 -12234 0
 12230  12231 -12232  1027 -12235 0

c  0-1 --> -1
c    (-b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧ -p_1027) -> ( b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0)
c  in CNF:
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨  b^{13, 80}_2
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_1
c     b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨  b^{13, 80}_0
c  in DIMACS:
 12230  12231  12232  1027  12233 0
 12230  12231  12232  1027 -12234 0
 12230  12231  12232  1027  12235 0

c  -1-1 --> -2
c    ( b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧  b^{13, 79}_0 ∧ -p_1027) -> ( b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0)
c  in CNF:
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨  b^{13, 80}_2
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨  b^{13, 80}_1
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨  p_1027 ∨ -b^{13, 80}_0
c  in DIMACS:
-12230  12231 -12232  1027  12233 0
-12230  12231 -12232  1027  12234 0
-12230  12231 -12232  1027 -12235 0

c  -2-1 --> break 
c    ( b^{13, 79}_2 ∧  b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧ -p_1027) -> break
c  in CNF:
c    -b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨  b^{13, 79}_0 ∨  p_1027 ∨ break
c  in DIMACS:
-12230 -12231  12232  1027 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 79}_2 ∧ -b^{13, 79}_1 ∧ -b^{13, 79}_0 ∧ true) 
c  in CNF:
c    -b^{13, 79}_2 ∨  b^{13, 79}_1 ∨  b^{13, 79}_0 ∨ false 
c  in DIMACS:
-12230  12231  12232  0

c  3 does not represent an automaton state.
c    -(-b^{13, 79}_2 ∧  b^{13, 79}_1 ∧  b^{13, 79}_0 ∧ true) 
c  in CNF:
c     b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ false 
c  in DIMACS:
 12230 -12231 -12232  0
c  -3 does not represent an automaton state.
c    -( b^{13, 79}_2 ∧  b^{13, 79}_1 ∧  b^{13, 79}_0 ∧ true) 
c  in CNF:
c    -b^{13, 79}_2 ∨ -b^{13, 79}_1 ∨ -b^{13, 79}_0 ∨ false 
c  in DIMACS:
-12230 -12231 -12232  0

c i = 80
c  -2+1 --> -1
c    ( b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧  p_1040) -> ( b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0)
c  in CNF:
c    -b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨  b^{13, 81}_2
c    -b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_1
c    -b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨  b^{13, 81}_0
c  in DIMACS:
-12233 -12234  12235 -1040  12236 0
-12233 -12234  12235 -1040 -12237 0
-12233 -12234  12235 -1040  12238 0

c  -1+1 --> 0
c    ( b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0 ∧  p_1040) -> (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧ -b^{13, 81}_0)
c  in CNF:
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_2
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_1
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_0
c  in DIMACS:
-12233  12234 -12235 -1040 -12236 0
-12233  12234 -12235 -1040 -12237 0
-12233  12234 -12235 -1040 -12238 0

c  0+1 --> 1
c    (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧  p_1040) -> (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0)
c  in CNF:
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_2
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_1
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨  b^{13, 81}_0
c  in DIMACS:
 12233  12234  12235 -1040 -12236 0
 12233  12234  12235 -1040 -12237 0
 12233  12234  12235 -1040  12238 0

c  1+1 --> 2
c    (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0 ∧  p_1040) -> (-b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0)
c  in CNF:
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_2
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨  b^{13, 81}_1
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ -p_1040 ∨ -b^{13, 81}_0
c  in DIMACS:
 12233  12234 -12235 -1040 -12236 0
 12233  12234 -12235 -1040  12237 0
 12233  12234 -12235 -1040 -12238 0

c  2+1 --> break 
c    (-b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 12233 -12234  12235 -1040 1162 0


c  2-1 --> 1
c    (-b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧ -p_1040) -> (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0)
c  in CNF:
c     b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_2
c     b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_1
c     b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨  b^{13, 81}_0
c  in DIMACS:
 12233 -12234  12235  1040 -12236 0
 12233 -12234  12235  1040 -12237 0
 12233 -12234  12235  1040  12238 0

c  1-1 --> 0
c    (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0 ∧ -p_1040) -> (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧ -b^{13, 81}_0)
c  in CNF:
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_2
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_1
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_0
c  in DIMACS:
 12233  12234 -12235  1040 -12236 0
 12233  12234 -12235  1040 -12237 0
 12233  12234 -12235  1040 -12238 0

c  0-1 --> -1
c    (-b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧ -p_1040) -> ( b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0)
c  in CNF:
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨  b^{13, 81}_2
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_1
c     b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨  b^{13, 81}_0
c  in DIMACS:
 12233  12234  12235  1040  12236 0
 12233  12234  12235  1040 -12237 0
 12233  12234  12235  1040  12238 0

c  -1-1 --> -2
c    ( b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧  b^{13, 80}_0 ∧ -p_1040) -> ( b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0)
c  in CNF:
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨  b^{13, 81}_2
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨  b^{13, 81}_1
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨  p_1040 ∨ -b^{13, 81}_0
c  in DIMACS:
-12233  12234 -12235  1040  12236 0
-12233  12234 -12235  1040  12237 0
-12233  12234 -12235  1040 -12238 0

c  -2-1 --> break 
c    ( b^{13, 80}_2 ∧  b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨  b^{13, 80}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-12233 -12234  12235  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 80}_2 ∧ -b^{13, 80}_1 ∧ -b^{13, 80}_0 ∧ true) 
c  in CNF:
c    -b^{13, 80}_2 ∨  b^{13, 80}_1 ∨  b^{13, 80}_0 ∨ false 
c  in DIMACS:
-12233  12234  12235  0

c  3 does not represent an automaton state.
c    -(-b^{13, 80}_2 ∧  b^{13, 80}_1 ∧  b^{13, 80}_0 ∧ true) 
c  in CNF:
c     b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ false 
c  in DIMACS:
 12233 -12234 -12235  0
c  -3 does not represent an automaton state.
c    -( b^{13, 80}_2 ∧  b^{13, 80}_1 ∧  b^{13, 80}_0 ∧ true) 
c  in CNF:
c    -b^{13, 80}_2 ∨ -b^{13, 80}_1 ∨ -b^{13, 80}_0 ∨ false 
c  in DIMACS:
-12233 -12234 -12235  0

c i = 81
c  -2+1 --> -1
c    ( b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧  p_1053) -> ( b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0)
c  in CNF:
c    -b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨  b^{13, 82}_2
c    -b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_1
c    -b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨  b^{13, 82}_0
c  in DIMACS:
-12236 -12237  12238 -1053  12239 0
-12236 -12237  12238 -1053 -12240 0
-12236 -12237  12238 -1053  12241 0

c  -1+1 --> 0
c    ( b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0 ∧  p_1053) -> (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧ -b^{13, 82}_0)
c  in CNF:
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_2
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_1
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_0
c  in DIMACS:
-12236  12237 -12238 -1053 -12239 0
-12236  12237 -12238 -1053 -12240 0
-12236  12237 -12238 -1053 -12241 0

c  0+1 --> 1
c    (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧  p_1053) -> (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0)
c  in CNF:
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_2
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_1
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨  b^{13, 82}_0
c  in DIMACS:
 12236  12237  12238 -1053 -12239 0
 12236  12237  12238 -1053 -12240 0
 12236  12237  12238 -1053  12241 0

c  1+1 --> 2
c    (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0 ∧  p_1053) -> (-b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0)
c  in CNF:
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_2
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨  b^{13, 82}_1
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ -p_1053 ∨ -b^{13, 82}_0
c  in DIMACS:
 12236  12237 -12238 -1053 -12239 0
 12236  12237 -12238 -1053  12240 0
 12236  12237 -12238 -1053 -12241 0

c  2+1 --> break 
c    (-b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 12236 -12237  12238 -1053 1162 0


c  2-1 --> 1
c    (-b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧ -p_1053) -> (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0)
c  in CNF:
c     b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_2
c     b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_1
c     b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨  b^{13, 82}_0
c  in DIMACS:
 12236 -12237  12238  1053 -12239 0
 12236 -12237  12238  1053 -12240 0
 12236 -12237  12238  1053  12241 0

c  1-1 --> 0
c    (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0 ∧ -p_1053) -> (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧ -b^{13, 82}_0)
c  in CNF:
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_2
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_1
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_0
c  in DIMACS:
 12236  12237 -12238  1053 -12239 0
 12236  12237 -12238  1053 -12240 0
 12236  12237 -12238  1053 -12241 0

c  0-1 --> -1
c    (-b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧ -p_1053) -> ( b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0)
c  in CNF:
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨  b^{13, 82}_2
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_1
c     b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨  b^{13, 82}_0
c  in DIMACS:
 12236  12237  12238  1053  12239 0
 12236  12237  12238  1053 -12240 0
 12236  12237  12238  1053  12241 0

c  -1-1 --> -2
c    ( b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧  b^{13, 81}_0 ∧ -p_1053) -> ( b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0)
c  in CNF:
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨  b^{13, 82}_2
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨  b^{13, 82}_1
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨  p_1053 ∨ -b^{13, 82}_0
c  in DIMACS:
-12236  12237 -12238  1053  12239 0
-12236  12237 -12238  1053  12240 0
-12236  12237 -12238  1053 -12241 0

c  -2-1 --> break 
c    ( b^{13, 81}_2 ∧  b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨  b^{13, 81}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-12236 -12237  12238  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 81}_2 ∧ -b^{13, 81}_1 ∧ -b^{13, 81}_0 ∧ true) 
c  in CNF:
c    -b^{13, 81}_2 ∨  b^{13, 81}_1 ∨  b^{13, 81}_0 ∨ false 
c  in DIMACS:
-12236  12237  12238  0

c  3 does not represent an automaton state.
c    -(-b^{13, 81}_2 ∧  b^{13, 81}_1 ∧  b^{13, 81}_0 ∧ true) 
c  in CNF:
c     b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ false 
c  in DIMACS:
 12236 -12237 -12238  0
c  -3 does not represent an automaton state.
c    -( b^{13, 81}_2 ∧  b^{13, 81}_1 ∧  b^{13, 81}_0 ∧ true) 
c  in CNF:
c    -b^{13, 81}_2 ∨ -b^{13, 81}_1 ∨ -b^{13, 81}_0 ∨ false 
c  in DIMACS:
-12236 -12237 -12238  0

c i = 82
c  -2+1 --> -1
c    ( b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧  p_1066) -> ( b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0)
c  in CNF:
c    -b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨  b^{13, 83}_2
c    -b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_1
c    -b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨  b^{13, 83}_0
c  in DIMACS:
-12239 -12240  12241 -1066  12242 0
-12239 -12240  12241 -1066 -12243 0
-12239 -12240  12241 -1066  12244 0

c  -1+1 --> 0
c    ( b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0 ∧  p_1066) -> (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧ -b^{13, 83}_0)
c  in CNF:
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_2
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_1
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_0
c  in DIMACS:
-12239  12240 -12241 -1066 -12242 0
-12239  12240 -12241 -1066 -12243 0
-12239  12240 -12241 -1066 -12244 0

c  0+1 --> 1
c    (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧  p_1066) -> (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0)
c  in CNF:
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_2
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_1
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨  b^{13, 83}_0
c  in DIMACS:
 12239  12240  12241 -1066 -12242 0
 12239  12240  12241 -1066 -12243 0
 12239  12240  12241 -1066  12244 0

c  1+1 --> 2
c    (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0 ∧  p_1066) -> (-b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0)
c  in CNF:
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_2
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨  b^{13, 83}_1
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ -p_1066 ∨ -b^{13, 83}_0
c  in DIMACS:
 12239  12240 -12241 -1066 -12242 0
 12239  12240 -12241 -1066  12243 0
 12239  12240 -12241 -1066 -12244 0

c  2+1 --> break 
c    (-b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 12239 -12240  12241 -1066 1162 0


c  2-1 --> 1
c    (-b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧ -p_1066) -> (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0)
c  in CNF:
c     b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_2
c     b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_1
c     b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨  b^{13, 83}_0
c  in DIMACS:
 12239 -12240  12241  1066 -12242 0
 12239 -12240  12241  1066 -12243 0
 12239 -12240  12241  1066  12244 0

c  1-1 --> 0
c    (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0 ∧ -p_1066) -> (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧ -b^{13, 83}_0)
c  in CNF:
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_2
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_1
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_0
c  in DIMACS:
 12239  12240 -12241  1066 -12242 0
 12239  12240 -12241  1066 -12243 0
 12239  12240 -12241  1066 -12244 0

c  0-1 --> -1
c    (-b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧ -p_1066) -> ( b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0)
c  in CNF:
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨  b^{13, 83}_2
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_1
c     b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨  b^{13, 83}_0
c  in DIMACS:
 12239  12240  12241  1066  12242 0
 12239  12240  12241  1066 -12243 0
 12239  12240  12241  1066  12244 0

c  -1-1 --> -2
c    ( b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧  b^{13, 82}_0 ∧ -p_1066) -> ( b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0)
c  in CNF:
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨  b^{13, 83}_2
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨  b^{13, 83}_1
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨  p_1066 ∨ -b^{13, 83}_0
c  in DIMACS:
-12239  12240 -12241  1066  12242 0
-12239  12240 -12241  1066  12243 0
-12239  12240 -12241  1066 -12244 0

c  -2-1 --> break 
c    ( b^{13, 82}_2 ∧  b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨  b^{13, 82}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-12239 -12240  12241  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 82}_2 ∧ -b^{13, 82}_1 ∧ -b^{13, 82}_0 ∧ true) 
c  in CNF:
c    -b^{13, 82}_2 ∨  b^{13, 82}_1 ∨  b^{13, 82}_0 ∨ false 
c  in DIMACS:
-12239  12240  12241  0

c  3 does not represent an automaton state.
c    -(-b^{13, 82}_2 ∧  b^{13, 82}_1 ∧  b^{13, 82}_0 ∧ true) 
c  in CNF:
c     b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ false 
c  in DIMACS:
 12239 -12240 -12241  0
c  -3 does not represent an automaton state.
c    -( b^{13, 82}_2 ∧  b^{13, 82}_1 ∧  b^{13, 82}_0 ∧ true) 
c  in CNF:
c    -b^{13, 82}_2 ∨ -b^{13, 82}_1 ∨ -b^{13, 82}_0 ∨ false 
c  in DIMACS:
-12239 -12240 -12241  0

c i = 83
c  -2+1 --> -1
c    ( b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧  p_1079) -> ( b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0)
c  in CNF:
c    -b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨  b^{13, 84}_2
c    -b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_1
c    -b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨  b^{13, 84}_0
c  in DIMACS:
-12242 -12243  12244 -1079  12245 0
-12242 -12243  12244 -1079 -12246 0
-12242 -12243  12244 -1079  12247 0

c  -1+1 --> 0
c    ( b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0 ∧  p_1079) -> (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧ -b^{13, 84}_0)
c  in CNF:
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_2
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_1
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_0
c  in DIMACS:
-12242  12243 -12244 -1079 -12245 0
-12242  12243 -12244 -1079 -12246 0
-12242  12243 -12244 -1079 -12247 0

c  0+1 --> 1
c    (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧  p_1079) -> (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0)
c  in CNF:
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_2
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_1
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨  b^{13, 84}_0
c  in DIMACS:
 12242  12243  12244 -1079 -12245 0
 12242  12243  12244 -1079 -12246 0
 12242  12243  12244 -1079  12247 0

c  1+1 --> 2
c    (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0 ∧  p_1079) -> (-b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0)
c  in CNF:
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_2
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨  b^{13, 84}_1
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ -p_1079 ∨ -b^{13, 84}_0
c  in DIMACS:
 12242  12243 -12244 -1079 -12245 0
 12242  12243 -12244 -1079  12246 0
 12242  12243 -12244 -1079 -12247 0

c  2+1 --> break 
c    (-b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧  p_1079) -> break
c  in CNF:
c     b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ -p_1079 ∨ break
c  in DIMACS:
 12242 -12243  12244 -1079 1162 0


c  2-1 --> 1
c    (-b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧ -p_1079) -> (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0)
c  in CNF:
c     b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_2
c     b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_1
c     b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨  b^{13, 84}_0
c  in DIMACS:
 12242 -12243  12244  1079 -12245 0
 12242 -12243  12244  1079 -12246 0
 12242 -12243  12244  1079  12247 0

c  1-1 --> 0
c    (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0 ∧ -p_1079) -> (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧ -b^{13, 84}_0)
c  in CNF:
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_2
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_1
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_0
c  in DIMACS:
 12242  12243 -12244  1079 -12245 0
 12242  12243 -12244  1079 -12246 0
 12242  12243 -12244  1079 -12247 0

c  0-1 --> -1
c    (-b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧ -p_1079) -> ( b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0)
c  in CNF:
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨  b^{13, 84}_2
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_1
c     b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨  b^{13, 84}_0
c  in DIMACS:
 12242  12243  12244  1079  12245 0
 12242  12243  12244  1079 -12246 0
 12242  12243  12244  1079  12247 0

c  -1-1 --> -2
c    ( b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧  b^{13, 83}_0 ∧ -p_1079) -> ( b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0)
c  in CNF:
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨  b^{13, 84}_2
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨  b^{13, 84}_1
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨  p_1079 ∨ -b^{13, 84}_0
c  in DIMACS:
-12242  12243 -12244  1079  12245 0
-12242  12243 -12244  1079  12246 0
-12242  12243 -12244  1079 -12247 0

c  -2-1 --> break 
c    ( b^{13, 83}_2 ∧  b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧ -p_1079) -> break
c  in CNF:
c    -b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨  b^{13, 83}_0 ∨  p_1079 ∨ break
c  in DIMACS:
-12242 -12243  12244  1079 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 83}_2 ∧ -b^{13, 83}_1 ∧ -b^{13, 83}_0 ∧ true) 
c  in CNF:
c    -b^{13, 83}_2 ∨  b^{13, 83}_1 ∨  b^{13, 83}_0 ∨ false 
c  in DIMACS:
-12242  12243  12244  0

c  3 does not represent an automaton state.
c    -(-b^{13, 83}_2 ∧  b^{13, 83}_1 ∧  b^{13, 83}_0 ∧ true) 
c  in CNF:
c     b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ false 
c  in DIMACS:
 12242 -12243 -12244  0
c  -3 does not represent an automaton state.
c    -( b^{13, 83}_2 ∧  b^{13, 83}_1 ∧  b^{13, 83}_0 ∧ true) 
c  in CNF:
c    -b^{13, 83}_2 ∨ -b^{13, 83}_1 ∨ -b^{13, 83}_0 ∨ false 
c  in DIMACS:
-12242 -12243 -12244  0

c i = 84
c  -2+1 --> -1
c    ( b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧  p_1092) -> ( b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0)
c  in CNF:
c    -b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨  b^{13, 85}_2
c    -b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_1
c    -b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨  b^{13, 85}_0
c  in DIMACS:
-12245 -12246  12247 -1092  12248 0
-12245 -12246  12247 -1092 -12249 0
-12245 -12246  12247 -1092  12250 0

c  -1+1 --> 0
c    ( b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0 ∧  p_1092) -> (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧ -b^{13, 85}_0)
c  in CNF:
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_2
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_1
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_0
c  in DIMACS:
-12245  12246 -12247 -1092 -12248 0
-12245  12246 -12247 -1092 -12249 0
-12245  12246 -12247 -1092 -12250 0

c  0+1 --> 1
c    (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧  p_1092) -> (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0)
c  in CNF:
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_2
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_1
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨  b^{13, 85}_0
c  in DIMACS:
 12245  12246  12247 -1092 -12248 0
 12245  12246  12247 -1092 -12249 0
 12245  12246  12247 -1092  12250 0

c  1+1 --> 2
c    (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0 ∧  p_1092) -> (-b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0)
c  in CNF:
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_2
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨  b^{13, 85}_1
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ -p_1092 ∨ -b^{13, 85}_0
c  in DIMACS:
 12245  12246 -12247 -1092 -12248 0
 12245  12246 -12247 -1092  12249 0
 12245  12246 -12247 -1092 -12250 0

c  2+1 --> break 
c    (-b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 12245 -12246  12247 -1092 1162 0


c  2-1 --> 1
c    (-b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧ -p_1092) -> (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0)
c  in CNF:
c     b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_2
c     b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_1
c     b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨  b^{13, 85}_0
c  in DIMACS:
 12245 -12246  12247  1092 -12248 0
 12245 -12246  12247  1092 -12249 0
 12245 -12246  12247  1092  12250 0

c  1-1 --> 0
c    (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0 ∧ -p_1092) -> (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧ -b^{13, 85}_0)
c  in CNF:
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_2
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_1
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_0
c  in DIMACS:
 12245  12246 -12247  1092 -12248 0
 12245  12246 -12247  1092 -12249 0
 12245  12246 -12247  1092 -12250 0

c  0-1 --> -1
c    (-b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧ -p_1092) -> ( b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0)
c  in CNF:
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨  b^{13, 85}_2
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_1
c     b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨  b^{13, 85}_0
c  in DIMACS:
 12245  12246  12247  1092  12248 0
 12245  12246  12247  1092 -12249 0
 12245  12246  12247  1092  12250 0

c  -1-1 --> -2
c    ( b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧  b^{13, 84}_0 ∧ -p_1092) -> ( b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0)
c  in CNF:
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨  b^{13, 85}_2
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨  b^{13, 85}_1
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨  p_1092 ∨ -b^{13, 85}_0
c  in DIMACS:
-12245  12246 -12247  1092  12248 0
-12245  12246 -12247  1092  12249 0
-12245  12246 -12247  1092 -12250 0

c  -2-1 --> break 
c    ( b^{13, 84}_2 ∧  b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨  b^{13, 84}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-12245 -12246  12247  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 84}_2 ∧ -b^{13, 84}_1 ∧ -b^{13, 84}_0 ∧ true) 
c  in CNF:
c    -b^{13, 84}_2 ∨  b^{13, 84}_1 ∨  b^{13, 84}_0 ∨ false 
c  in DIMACS:
-12245  12246  12247  0

c  3 does not represent an automaton state.
c    -(-b^{13, 84}_2 ∧  b^{13, 84}_1 ∧  b^{13, 84}_0 ∧ true) 
c  in CNF:
c     b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ false 
c  in DIMACS:
 12245 -12246 -12247  0
c  -3 does not represent an automaton state.
c    -( b^{13, 84}_2 ∧  b^{13, 84}_1 ∧  b^{13, 84}_0 ∧ true) 
c  in CNF:
c    -b^{13, 84}_2 ∨ -b^{13, 84}_1 ∨ -b^{13, 84}_0 ∨ false 
c  in DIMACS:
-12245 -12246 -12247  0

c i = 85
c  -2+1 --> -1
c    ( b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧  p_1105) -> ( b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0)
c  in CNF:
c    -b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨  b^{13, 86}_2
c    -b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_1
c    -b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨  b^{13, 86}_0
c  in DIMACS:
-12248 -12249  12250 -1105  12251 0
-12248 -12249  12250 -1105 -12252 0
-12248 -12249  12250 -1105  12253 0

c  -1+1 --> 0
c    ( b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0 ∧  p_1105) -> (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧ -b^{13, 86}_0)
c  in CNF:
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_2
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_1
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_0
c  in DIMACS:
-12248  12249 -12250 -1105 -12251 0
-12248  12249 -12250 -1105 -12252 0
-12248  12249 -12250 -1105 -12253 0

c  0+1 --> 1
c    (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧  p_1105) -> (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0)
c  in CNF:
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_2
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_1
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨  b^{13, 86}_0
c  in DIMACS:
 12248  12249  12250 -1105 -12251 0
 12248  12249  12250 -1105 -12252 0
 12248  12249  12250 -1105  12253 0

c  1+1 --> 2
c    (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0 ∧  p_1105) -> (-b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0)
c  in CNF:
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_2
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨  b^{13, 86}_1
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ -p_1105 ∨ -b^{13, 86}_0
c  in DIMACS:
 12248  12249 -12250 -1105 -12251 0
 12248  12249 -12250 -1105  12252 0
 12248  12249 -12250 -1105 -12253 0

c  2+1 --> break 
c    (-b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 12248 -12249  12250 -1105 1162 0


c  2-1 --> 1
c    (-b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧ -p_1105) -> (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0)
c  in CNF:
c     b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_2
c     b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_1
c     b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨  b^{13, 86}_0
c  in DIMACS:
 12248 -12249  12250  1105 -12251 0
 12248 -12249  12250  1105 -12252 0
 12248 -12249  12250  1105  12253 0

c  1-1 --> 0
c    (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0 ∧ -p_1105) -> (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧ -b^{13, 86}_0)
c  in CNF:
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_2
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_1
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_0
c  in DIMACS:
 12248  12249 -12250  1105 -12251 0
 12248  12249 -12250  1105 -12252 0
 12248  12249 -12250  1105 -12253 0

c  0-1 --> -1
c    (-b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧ -p_1105) -> ( b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0)
c  in CNF:
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨  b^{13, 86}_2
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_1
c     b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨  b^{13, 86}_0
c  in DIMACS:
 12248  12249  12250  1105  12251 0
 12248  12249  12250  1105 -12252 0
 12248  12249  12250  1105  12253 0

c  -1-1 --> -2
c    ( b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧  b^{13, 85}_0 ∧ -p_1105) -> ( b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0)
c  in CNF:
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨  b^{13, 86}_2
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨  b^{13, 86}_1
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨  p_1105 ∨ -b^{13, 86}_0
c  in DIMACS:
-12248  12249 -12250  1105  12251 0
-12248  12249 -12250  1105  12252 0
-12248  12249 -12250  1105 -12253 0

c  -2-1 --> break 
c    ( b^{13, 85}_2 ∧  b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨  b^{13, 85}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-12248 -12249  12250  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 85}_2 ∧ -b^{13, 85}_1 ∧ -b^{13, 85}_0 ∧ true) 
c  in CNF:
c    -b^{13, 85}_2 ∨  b^{13, 85}_1 ∨  b^{13, 85}_0 ∨ false 
c  in DIMACS:
-12248  12249  12250  0

c  3 does not represent an automaton state.
c    -(-b^{13, 85}_2 ∧  b^{13, 85}_1 ∧  b^{13, 85}_0 ∧ true) 
c  in CNF:
c     b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ false 
c  in DIMACS:
 12248 -12249 -12250  0
c  -3 does not represent an automaton state.
c    -( b^{13, 85}_2 ∧  b^{13, 85}_1 ∧  b^{13, 85}_0 ∧ true) 
c  in CNF:
c    -b^{13, 85}_2 ∨ -b^{13, 85}_1 ∨ -b^{13, 85}_0 ∨ false 
c  in DIMACS:
-12248 -12249 -12250  0

c i = 86
c  -2+1 --> -1
c    ( b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧  p_1118) -> ( b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0)
c  in CNF:
c    -b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨  b^{13, 87}_2
c    -b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_1
c    -b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨  b^{13, 87}_0
c  in DIMACS:
-12251 -12252  12253 -1118  12254 0
-12251 -12252  12253 -1118 -12255 0
-12251 -12252  12253 -1118  12256 0

c  -1+1 --> 0
c    ( b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0 ∧  p_1118) -> (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧ -b^{13, 87}_0)
c  in CNF:
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_2
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_1
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_0
c  in DIMACS:
-12251  12252 -12253 -1118 -12254 0
-12251  12252 -12253 -1118 -12255 0
-12251  12252 -12253 -1118 -12256 0

c  0+1 --> 1
c    (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧  p_1118) -> (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0)
c  in CNF:
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_2
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_1
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨  b^{13, 87}_0
c  in DIMACS:
 12251  12252  12253 -1118 -12254 0
 12251  12252  12253 -1118 -12255 0
 12251  12252  12253 -1118  12256 0

c  1+1 --> 2
c    (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0 ∧  p_1118) -> (-b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0)
c  in CNF:
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_2
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨  b^{13, 87}_1
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ -p_1118 ∨ -b^{13, 87}_0
c  in DIMACS:
 12251  12252 -12253 -1118 -12254 0
 12251  12252 -12253 -1118  12255 0
 12251  12252 -12253 -1118 -12256 0

c  2+1 --> break 
c    (-b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 12251 -12252  12253 -1118 1162 0


c  2-1 --> 1
c    (-b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧ -p_1118) -> (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0)
c  in CNF:
c     b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_2
c     b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_1
c     b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨  b^{13, 87}_0
c  in DIMACS:
 12251 -12252  12253  1118 -12254 0
 12251 -12252  12253  1118 -12255 0
 12251 -12252  12253  1118  12256 0

c  1-1 --> 0
c    (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0 ∧ -p_1118) -> (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧ -b^{13, 87}_0)
c  in CNF:
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_2
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_1
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_0
c  in DIMACS:
 12251  12252 -12253  1118 -12254 0
 12251  12252 -12253  1118 -12255 0
 12251  12252 -12253  1118 -12256 0

c  0-1 --> -1
c    (-b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧ -p_1118) -> ( b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0)
c  in CNF:
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨  b^{13, 87}_2
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_1
c     b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨  b^{13, 87}_0
c  in DIMACS:
 12251  12252  12253  1118  12254 0
 12251  12252  12253  1118 -12255 0
 12251  12252  12253  1118  12256 0

c  -1-1 --> -2
c    ( b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧  b^{13, 86}_0 ∧ -p_1118) -> ( b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0)
c  in CNF:
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨  b^{13, 87}_2
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨  b^{13, 87}_1
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨  p_1118 ∨ -b^{13, 87}_0
c  in DIMACS:
-12251  12252 -12253  1118  12254 0
-12251  12252 -12253  1118  12255 0
-12251  12252 -12253  1118 -12256 0

c  -2-1 --> break 
c    ( b^{13, 86}_2 ∧  b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨  b^{13, 86}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-12251 -12252  12253  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 86}_2 ∧ -b^{13, 86}_1 ∧ -b^{13, 86}_0 ∧ true) 
c  in CNF:
c    -b^{13, 86}_2 ∨  b^{13, 86}_1 ∨  b^{13, 86}_0 ∨ false 
c  in DIMACS:
-12251  12252  12253  0

c  3 does not represent an automaton state.
c    -(-b^{13, 86}_2 ∧  b^{13, 86}_1 ∧  b^{13, 86}_0 ∧ true) 
c  in CNF:
c     b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ false 
c  in DIMACS:
 12251 -12252 -12253  0
c  -3 does not represent an automaton state.
c    -( b^{13, 86}_2 ∧  b^{13, 86}_1 ∧  b^{13, 86}_0 ∧ true) 
c  in CNF:
c    -b^{13, 86}_2 ∨ -b^{13, 86}_1 ∨ -b^{13, 86}_0 ∨ false 
c  in DIMACS:
-12251 -12252 -12253  0

c i = 87
c  -2+1 --> -1
c    ( b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧  p_1131) -> ( b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0)
c  in CNF:
c    -b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨  b^{13, 88}_2
c    -b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_1
c    -b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨  b^{13, 88}_0
c  in DIMACS:
-12254 -12255  12256 -1131  12257 0
-12254 -12255  12256 -1131 -12258 0
-12254 -12255  12256 -1131  12259 0

c  -1+1 --> 0
c    ( b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0 ∧  p_1131) -> (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧ -b^{13, 88}_0)
c  in CNF:
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_2
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_1
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_0
c  in DIMACS:
-12254  12255 -12256 -1131 -12257 0
-12254  12255 -12256 -1131 -12258 0
-12254  12255 -12256 -1131 -12259 0

c  0+1 --> 1
c    (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧  p_1131) -> (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0)
c  in CNF:
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_2
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_1
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨  b^{13, 88}_0
c  in DIMACS:
 12254  12255  12256 -1131 -12257 0
 12254  12255  12256 -1131 -12258 0
 12254  12255  12256 -1131  12259 0

c  1+1 --> 2
c    (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0 ∧  p_1131) -> (-b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0)
c  in CNF:
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_2
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨  b^{13, 88}_1
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ -p_1131 ∨ -b^{13, 88}_0
c  in DIMACS:
 12254  12255 -12256 -1131 -12257 0
 12254  12255 -12256 -1131  12258 0
 12254  12255 -12256 -1131 -12259 0

c  2+1 --> break 
c    (-b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 12254 -12255  12256 -1131 1162 0


c  2-1 --> 1
c    (-b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧ -p_1131) -> (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0)
c  in CNF:
c     b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_2
c     b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_1
c     b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨  b^{13, 88}_0
c  in DIMACS:
 12254 -12255  12256  1131 -12257 0
 12254 -12255  12256  1131 -12258 0
 12254 -12255  12256  1131  12259 0

c  1-1 --> 0
c    (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0 ∧ -p_1131) -> (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧ -b^{13, 88}_0)
c  in CNF:
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_2
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_1
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_0
c  in DIMACS:
 12254  12255 -12256  1131 -12257 0
 12254  12255 -12256  1131 -12258 0
 12254  12255 -12256  1131 -12259 0

c  0-1 --> -1
c    (-b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧ -p_1131) -> ( b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0)
c  in CNF:
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨  b^{13, 88}_2
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_1
c     b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨  b^{13, 88}_0
c  in DIMACS:
 12254  12255  12256  1131  12257 0
 12254  12255  12256  1131 -12258 0
 12254  12255  12256  1131  12259 0

c  -1-1 --> -2
c    ( b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧  b^{13, 87}_0 ∧ -p_1131) -> ( b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0)
c  in CNF:
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨  b^{13, 88}_2
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨  b^{13, 88}_1
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨  p_1131 ∨ -b^{13, 88}_0
c  in DIMACS:
-12254  12255 -12256  1131  12257 0
-12254  12255 -12256  1131  12258 0
-12254  12255 -12256  1131 -12259 0

c  -2-1 --> break 
c    ( b^{13, 87}_2 ∧  b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨  b^{13, 87}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-12254 -12255  12256  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 87}_2 ∧ -b^{13, 87}_1 ∧ -b^{13, 87}_0 ∧ true) 
c  in CNF:
c    -b^{13, 87}_2 ∨  b^{13, 87}_1 ∨  b^{13, 87}_0 ∨ false 
c  in DIMACS:
-12254  12255  12256  0

c  3 does not represent an automaton state.
c    -(-b^{13, 87}_2 ∧  b^{13, 87}_1 ∧  b^{13, 87}_0 ∧ true) 
c  in CNF:
c     b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ false 
c  in DIMACS:
 12254 -12255 -12256  0
c  -3 does not represent an automaton state.
c    -( b^{13, 87}_2 ∧  b^{13, 87}_1 ∧  b^{13, 87}_0 ∧ true) 
c  in CNF:
c    -b^{13, 87}_2 ∨ -b^{13, 87}_1 ∨ -b^{13, 87}_0 ∨ false 
c  in DIMACS:
-12254 -12255 -12256  0

c i = 88
c  -2+1 --> -1
c    ( b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧  p_1144) -> ( b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0)
c  in CNF:
c    -b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨  b^{13, 89}_2
c    -b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_1
c    -b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨  b^{13, 89}_0
c  in DIMACS:
-12257 -12258  12259 -1144  12260 0
-12257 -12258  12259 -1144 -12261 0
-12257 -12258  12259 -1144  12262 0

c  -1+1 --> 0
c    ( b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0 ∧  p_1144) -> (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧ -b^{13, 89}_0)
c  in CNF:
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_2
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_1
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_0
c  in DIMACS:
-12257  12258 -12259 -1144 -12260 0
-12257  12258 -12259 -1144 -12261 0
-12257  12258 -12259 -1144 -12262 0

c  0+1 --> 1
c    (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧  p_1144) -> (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0)
c  in CNF:
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_2
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_1
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨  b^{13, 89}_0
c  in DIMACS:
 12257  12258  12259 -1144 -12260 0
 12257  12258  12259 -1144 -12261 0
 12257  12258  12259 -1144  12262 0

c  1+1 --> 2
c    (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0 ∧  p_1144) -> (-b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0)
c  in CNF:
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_2
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨  b^{13, 89}_1
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ -p_1144 ∨ -b^{13, 89}_0
c  in DIMACS:
 12257  12258 -12259 -1144 -12260 0
 12257  12258 -12259 -1144  12261 0
 12257  12258 -12259 -1144 -12262 0

c  2+1 --> break 
c    (-b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 12257 -12258  12259 -1144 1162 0


c  2-1 --> 1
c    (-b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧ -p_1144) -> (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0)
c  in CNF:
c     b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_2
c     b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_1
c     b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨  b^{13, 89}_0
c  in DIMACS:
 12257 -12258  12259  1144 -12260 0
 12257 -12258  12259  1144 -12261 0
 12257 -12258  12259  1144  12262 0

c  1-1 --> 0
c    (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0 ∧ -p_1144) -> (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧ -b^{13, 89}_0)
c  in CNF:
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_2
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_1
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_0
c  in DIMACS:
 12257  12258 -12259  1144 -12260 0
 12257  12258 -12259  1144 -12261 0
 12257  12258 -12259  1144 -12262 0

c  0-1 --> -1
c    (-b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧ -p_1144) -> ( b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0)
c  in CNF:
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨  b^{13, 89}_2
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_1
c     b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨  b^{13, 89}_0
c  in DIMACS:
 12257  12258  12259  1144  12260 0
 12257  12258  12259  1144 -12261 0
 12257  12258  12259  1144  12262 0

c  -1-1 --> -2
c    ( b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧  b^{13, 88}_0 ∧ -p_1144) -> ( b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0)
c  in CNF:
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨  b^{13, 89}_2
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨  b^{13, 89}_1
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨  p_1144 ∨ -b^{13, 89}_0
c  in DIMACS:
-12257  12258 -12259  1144  12260 0
-12257  12258 -12259  1144  12261 0
-12257  12258 -12259  1144 -12262 0

c  -2-1 --> break 
c    ( b^{13, 88}_2 ∧  b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨  b^{13, 88}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-12257 -12258  12259  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 88}_2 ∧ -b^{13, 88}_1 ∧ -b^{13, 88}_0 ∧ true) 
c  in CNF:
c    -b^{13, 88}_2 ∨  b^{13, 88}_1 ∨  b^{13, 88}_0 ∨ false 
c  in DIMACS:
-12257  12258  12259  0

c  3 does not represent an automaton state.
c    -(-b^{13, 88}_2 ∧  b^{13, 88}_1 ∧  b^{13, 88}_0 ∧ true) 
c  in CNF:
c     b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ false 
c  in DIMACS:
 12257 -12258 -12259  0
c  -3 does not represent an automaton state.
c    -( b^{13, 88}_2 ∧  b^{13, 88}_1 ∧  b^{13, 88}_0 ∧ true) 
c  in CNF:
c    -b^{13, 88}_2 ∨ -b^{13, 88}_1 ∨ -b^{13, 88}_0 ∨ false 
c  in DIMACS:
-12257 -12258 -12259  0

c i = 89
c  -2+1 --> -1
c    ( b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧  p_1157) -> ( b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧  b^{13, 90}_0)
c  in CNF:
c    -b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨  b^{13, 90}_2
c    -b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_1
c    -b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨  b^{13, 90}_0
c  in DIMACS:
-12260 -12261  12262 -1157  12263 0
-12260 -12261  12262 -1157 -12264 0
-12260 -12261  12262 -1157  12265 0

c  -1+1 --> 0
c    ( b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0 ∧  p_1157) -> (-b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧ -b^{13, 90}_0)
c  in CNF:
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_2
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_1
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_0
c  in DIMACS:
-12260  12261 -12262 -1157 -12263 0
-12260  12261 -12262 -1157 -12264 0
-12260  12261 -12262 -1157 -12265 0

c  0+1 --> 1
c    (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧  p_1157) -> (-b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧  b^{13, 90}_0)
c  in CNF:
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_2
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_1
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨  b^{13, 90}_0
c  in DIMACS:
 12260  12261  12262 -1157 -12263 0
 12260  12261  12262 -1157 -12264 0
 12260  12261  12262 -1157  12265 0

c  1+1 --> 2
c    (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0 ∧  p_1157) -> (-b^{13, 90}_2 ∧  b^{13, 90}_1 ∧ -b^{13, 90}_0)
c  in CNF:
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_2
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨  b^{13, 90}_1
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ -p_1157 ∨ -b^{13, 90}_0
c  in DIMACS:
 12260  12261 -12262 -1157 -12263 0
 12260  12261 -12262 -1157  12264 0
 12260  12261 -12262 -1157 -12265 0

c  2+1 --> break 
c    (-b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧  p_1157) -> break
c  in CNF:
c     b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ -p_1157 ∨ break
c  in DIMACS:
 12260 -12261  12262 -1157 1162 0


c  2-1 --> 1
c    (-b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧ -p_1157) -> (-b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧  b^{13, 90}_0)
c  in CNF:
c     b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_2
c     b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_1
c     b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨  b^{13, 90}_0
c  in DIMACS:
 12260 -12261  12262  1157 -12263 0
 12260 -12261  12262  1157 -12264 0
 12260 -12261  12262  1157  12265 0

c  1-1 --> 0
c    (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0 ∧ -p_1157) -> (-b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧ -b^{13, 90}_0)
c  in CNF:
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_2
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_1
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_0
c  in DIMACS:
 12260  12261 -12262  1157 -12263 0
 12260  12261 -12262  1157 -12264 0
 12260  12261 -12262  1157 -12265 0

c  0-1 --> -1
c    (-b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧ -p_1157) -> ( b^{13, 90}_2 ∧ -b^{13, 90}_1 ∧  b^{13, 90}_0)
c  in CNF:
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨  b^{13, 90}_2
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_1
c     b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨  b^{13, 90}_0
c  in DIMACS:
 12260  12261  12262  1157  12263 0
 12260  12261  12262  1157 -12264 0
 12260  12261  12262  1157  12265 0

c  -1-1 --> -2
c    ( b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧  b^{13, 89}_0 ∧ -p_1157) -> ( b^{13, 90}_2 ∧  b^{13, 90}_1 ∧ -b^{13, 90}_0)
c  in CNF:
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨  b^{13, 90}_2
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨  b^{13, 90}_1
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨  p_1157 ∨ -b^{13, 90}_0
c  in DIMACS:
-12260  12261 -12262  1157  12263 0
-12260  12261 -12262  1157  12264 0
-12260  12261 -12262  1157 -12265 0

c  -2-1 --> break 
c    ( b^{13, 89}_2 ∧  b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧ -p_1157) -> break
c  in CNF:
c    -b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨  b^{13, 89}_0 ∨  p_1157 ∨ break
c  in DIMACS:
-12260 -12261  12262  1157 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{13, 89}_2 ∧ -b^{13, 89}_1 ∧ -b^{13, 89}_0 ∧ true) 
c  in CNF:
c    -b^{13, 89}_2 ∨  b^{13, 89}_1 ∨  b^{13, 89}_0 ∨ false 
c  in DIMACS:
-12260  12261  12262  0

c  3 does not represent an automaton state.
c    -(-b^{13, 89}_2 ∧  b^{13, 89}_1 ∧  b^{13, 89}_0 ∧ true) 
c  in CNF:
c     b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ false 
c  in DIMACS:
 12260 -12261 -12262  0
c  -3 does not represent an automaton state.
c    -( b^{13, 89}_2 ∧  b^{13, 89}_1 ∧  b^{13, 89}_0 ∧ true) 
c  in CNF:
c    -b^{13, 89}_2 ∨ -b^{13, 89}_1 ∨ -b^{13, 89}_0 ∨ false 
c  in DIMACS:
-12260 -12261 -12262  0

c INIT for k = 14
c    -b^{14, 1}_2
c    -b^{14, 1}_1
c    -b^{14, 1}_0
c  in DIMACS:
-12266 0
-12267 0
-12268 0

c Transitions for k = 14
c i = 1
c  -2+1 --> -1
c    ( b^{14, 1}_2 ∧  b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧  p_14) -> ( b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0)
c  in CNF:
c    -b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨  b^{14, 2}_2
c    -b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_1
c    -b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨  b^{14, 2}_0
c  in DIMACS:
-12266 -12267  12268 -14  12269 0
-12266 -12267  12268 -14 -12270 0
-12266 -12267  12268 -14  12271 0

c  -1+1 --> 0
c    ( b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧  b^{14, 1}_0 ∧  p_14) -> (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧ -b^{14, 2}_0)
c  in CNF:
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_2
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_1
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_0
c  in DIMACS:
-12266  12267 -12268 -14 -12269 0
-12266  12267 -12268 -14 -12270 0
-12266  12267 -12268 -14 -12271 0

c  0+1 --> 1
c    (-b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧  p_14) -> (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0)
c  in CNF:
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_2
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_1
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨  b^{14, 2}_0
c  in DIMACS:
 12266  12267  12268 -14 -12269 0
 12266  12267  12268 -14 -12270 0
 12266  12267  12268 -14  12271 0

c  1+1 --> 2
c    (-b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧  b^{14, 1}_0 ∧  p_14) -> (-b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0)
c  in CNF:
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_2
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨  b^{14, 2}_1
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ -p_14 ∨ -b^{14, 2}_0
c  in DIMACS:
 12266  12267 -12268 -14 -12269 0
 12266  12267 -12268 -14  12270 0
 12266  12267 -12268 -14 -12271 0

c  2+1 --> break 
c    (-b^{14, 1}_2 ∧  b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧  p_14) -> break
c  in CNF:
c     b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ -p_14 ∨ break
c  in DIMACS:
 12266 -12267  12268 -14 1162 0


c  2-1 --> 1
c    (-b^{14, 1}_2 ∧  b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧ -p_14) -> (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0)
c  in CNF:
c     b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_2
c     b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_1
c     b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨  b^{14, 2}_0
c  in DIMACS:
 12266 -12267  12268  14 -12269 0
 12266 -12267  12268  14 -12270 0
 12266 -12267  12268  14  12271 0

c  1-1 --> 0
c    (-b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧  b^{14, 1}_0 ∧ -p_14) -> (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧ -b^{14, 2}_0)
c  in CNF:
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_2
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_1
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_0
c  in DIMACS:
 12266  12267 -12268  14 -12269 0
 12266  12267 -12268  14 -12270 0
 12266  12267 -12268  14 -12271 0

c  0-1 --> -1
c    (-b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧ -p_14) -> ( b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0)
c  in CNF:
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨  b^{14, 2}_2
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_1
c     b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨  b^{14, 2}_0
c  in DIMACS:
 12266  12267  12268  14  12269 0
 12266  12267  12268  14 -12270 0
 12266  12267  12268  14  12271 0

c  -1-1 --> -2
c    ( b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧  b^{14, 1}_0 ∧ -p_14) -> ( b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0)
c  in CNF:
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨  b^{14, 2}_2
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨  b^{14, 2}_1
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨  p_14 ∨ -b^{14, 2}_0
c  in DIMACS:
-12266  12267 -12268  14  12269 0
-12266  12267 -12268  14  12270 0
-12266  12267 -12268  14 -12271 0

c  -2-1 --> break 
c    ( b^{14, 1}_2 ∧  b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧ -p_14) -> break
c  in CNF:
c    -b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨  b^{14, 1}_0 ∨  p_14 ∨ break
c  in DIMACS:
-12266 -12267  12268  14 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 1}_2 ∧ -b^{14, 1}_1 ∧ -b^{14, 1}_0 ∧ true) 
c  in CNF:
c    -b^{14, 1}_2 ∨  b^{14, 1}_1 ∨  b^{14, 1}_0 ∨ false 
c  in DIMACS:
-12266  12267  12268  0

c  3 does not represent an automaton state.
c    -(-b^{14, 1}_2 ∧  b^{14, 1}_1 ∧  b^{14, 1}_0 ∧ true) 
c  in CNF:
c     b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ false 
c  in DIMACS:
 12266 -12267 -12268  0
c  -3 does not represent an automaton state.
c    -( b^{14, 1}_2 ∧  b^{14, 1}_1 ∧  b^{14, 1}_0 ∧ true) 
c  in CNF:
c    -b^{14, 1}_2 ∨ -b^{14, 1}_1 ∨ -b^{14, 1}_0 ∨ false 
c  in DIMACS:
-12266 -12267 -12268  0

c i = 2
c  -2+1 --> -1
c    ( b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧  p_28) -> ( b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0)
c  in CNF:
c    -b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨  b^{14, 3}_2
c    -b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_1
c    -b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨  b^{14, 3}_0
c  in DIMACS:
-12269 -12270  12271 -28  12272 0
-12269 -12270  12271 -28 -12273 0
-12269 -12270  12271 -28  12274 0

c  -1+1 --> 0
c    ( b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0 ∧  p_28) -> (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧ -b^{14, 3}_0)
c  in CNF:
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_2
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_1
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_0
c  in DIMACS:
-12269  12270 -12271 -28 -12272 0
-12269  12270 -12271 -28 -12273 0
-12269  12270 -12271 -28 -12274 0

c  0+1 --> 1
c    (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧  p_28) -> (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0)
c  in CNF:
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_2
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_1
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨  b^{14, 3}_0
c  in DIMACS:
 12269  12270  12271 -28 -12272 0
 12269  12270  12271 -28 -12273 0
 12269  12270  12271 -28  12274 0

c  1+1 --> 2
c    (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0 ∧  p_28) -> (-b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0)
c  in CNF:
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_2
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨  b^{14, 3}_1
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ -p_28 ∨ -b^{14, 3}_0
c  in DIMACS:
 12269  12270 -12271 -28 -12272 0
 12269  12270 -12271 -28  12273 0
 12269  12270 -12271 -28 -12274 0

c  2+1 --> break 
c    (-b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧  p_28) -> break
c  in CNF:
c     b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 12269 -12270  12271 -28 1162 0


c  2-1 --> 1
c    (-b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧ -p_28) -> (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0)
c  in CNF:
c     b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_2
c     b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_1
c     b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨  b^{14, 3}_0
c  in DIMACS:
 12269 -12270  12271  28 -12272 0
 12269 -12270  12271  28 -12273 0
 12269 -12270  12271  28  12274 0

c  1-1 --> 0
c    (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0 ∧ -p_28) -> (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧ -b^{14, 3}_0)
c  in CNF:
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_2
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_1
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_0
c  in DIMACS:
 12269  12270 -12271  28 -12272 0
 12269  12270 -12271  28 -12273 0
 12269  12270 -12271  28 -12274 0

c  0-1 --> -1
c    (-b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧ -p_28) -> ( b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0)
c  in CNF:
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨  b^{14, 3}_2
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_1
c     b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨  b^{14, 3}_0
c  in DIMACS:
 12269  12270  12271  28  12272 0
 12269  12270  12271  28 -12273 0
 12269  12270  12271  28  12274 0

c  -1-1 --> -2
c    ( b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧  b^{14, 2}_0 ∧ -p_28) -> ( b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0)
c  in CNF:
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨  b^{14, 3}_2
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨  b^{14, 3}_1
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨  p_28 ∨ -b^{14, 3}_0
c  in DIMACS:
-12269  12270 -12271  28  12272 0
-12269  12270 -12271  28  12273 0
-12269  12270 -12271  28 -12274 0

c  -2-1 --> break 
c    ( b^{14, 2}_2 ∧  b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨  b^{14, 2}_0 ∨  p_28 ∨ break
c  in DIMACS:
-12269 -12270  12271  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 2}_2 ∧ -b^{14, 2}_1 ∧ -b^{14, 2}_0 ∧ true) 
c  in CNF:
c    -b^{14, 2}_2 ∨  b^{14, 2}_1 ∨  b^{14, 2}_0 ∨ false 
c  in DIMACS:
-12269  12270  12271  0

c  3 does not represent an automaton state.
c    -(-b^{14, 2}_2 ∧  b^{14, 2}_1 ∧  b^{14, 2}_0 ∧ true) 
c  in CNF:
c     b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ false 
c  in DIMACS:
 12269 -12270 -12271  0
c  -3 does not represent an automaton state.
c    -( b^{14, 2}_2 ∧  b^{14, 2}_1 ∧  b^{14, 2}_0 ∧ true) 
c  in CNF:
c    -b^{14, 2}_2 ∨ -b^{14, 2}_1 ∨ -b^{14, 2}_0 ∨ false 
c  in DIMACS:
-12269 -12270 -12271  0

c i = 3
c  -2+1 --> -1
c    ( b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧  p_42) -> ( b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0)
c  in CNF:
c    -b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨  b^{14, 4}_2
c    -b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_1
c    -b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨  b^{14, 4}_0
c  in DIMACS:
-12272 -12273  12274 -42  12275 0
-12272 -12273  12274 -42 -12276 0
-12272 -12273  12274 -42  12277 0

c  -1+1 --> 0
c    ( b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0 ∧  p_42) -> (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧ -b^{14, 4}_0)
c  in CNF:
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_2
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_1
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_0
c  in DIMACS:
-12272  12273 -12274 -42 -12275 0
-12272  12273 -12274 -42 -12276 0
-12272  12273 -12274 -42 -12277 0

c  0+1 --> 1
c    (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧  p_42) -> (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0)
c  in CNF:
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_2
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_1
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨  b^{14, 4}_0
c  in DIMACS:
 12272  12273  12274 -42 -12275 0
 12272  12273  12274 -42 -12276 0
 12272  12273  12274 -42  12277 0

c  1+1 --> 2
c    (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0 ∧  p_42) -> (-b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0)
c  in CNF:
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_2
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨  b^{14, 4}_1
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ -p_42 ∨ -b^{14, 4}_0
c  in DIMACS:
 12272  12273 -12274 -42 -12275 0
 12272  12273 -12274 -42  12276 0
 12272  12273 -12274 -42 -12277 0

c  2+1 --> break 
c    (-b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧  p_42) -> break
c  in CNF:
c     b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 12272 -12273  12274 -42 1162 0


c  2-1 --> 1
c    (-b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧ -p_42) -> (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0)
c  in CNF:
c     b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_2
c     b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_1
c     b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨  b^{14, 4}_0
c  in DIMACS:
 12272 -12273  12274  42 -12275 0
 12272 -12273  12274  42 -12276 0
 12272 -12273  12274  42  12277 0

c  1-1 --> 0
c    (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0 ∧ -p_42) -> (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧ -b^{14, 4}_0)
c  in CNF:
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_2
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_1
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_0
c  in DIMACS:
 12272  12273 -12274  42 -12275 0
 12272  12273 -12274  42 -12276 0
 12272  12273 -12274  42 -12277 0

c  0-1 --> -1
c    (-b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧ -p_42) -> ( b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0)
c  in CNF:
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨  b^{14, 4}_2
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_1
c     b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨  b^{14, 4}_0
c  in DIMACS:
 12272  12273  12274  42  12275 0
 12272  12273  12274  42 -12276 0
 12272  12273  12274  42  12277 0

c  -1-1 --> -2
c    ( b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧  b^{14, 3}_0 ∧ -p_42) -> ( b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0)
c  in CNF:
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨  b^{14, 4}_2
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨  b^{14, 4}_1
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨  p_42 ∨ -b^{14, 4}_0
c  in DIMACS:
-12272  12273 -12274  42  12275 0
-12272  12273 -12274  42  12276 0
-12272  12273 -12274  42 -12277 0

c  -2-1 --> break 
c    ( b^{14, 3}_2 ∧  b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨  b^{14, 3}_0 ∨  p_42 ∨ break
c  in DIMACS:
-12272 -12273  12274  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 3}_2 ∧ -b^{14, 3}_1 ∧ -b^{14, 3}_0 ∧ true) 
c  in CNF:
c    -b^{14, 3}_2 ∨  b^{14, 3}_1 ∨  b^{14, 3}_0 ∨ false 
c  in DIMACS:
-12272  12273  12274  0

c  3 does not represent an automaton state.
c    -(-b^{14, 3}_2 ∧  b^{14, 3}_1 ∧  b^{14, 3}_0 ∧ true) 
c  in CNF:
c     b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ false 
c  in DIMACS:
 12272 -12273 -12274  0
c  -3 does not represent an automaton state.
c    -( b^{14, 3}_2 ∧  b^{14, 3}_1 ∧  b^{14, 3}_0 ∧ true) 
c  in CNF:
c    -b^{14, 3}_2 ∨ -b^{14, 3}_1 ∨ -b^{14, 3}_0 ∨ false 
c  in DIMACS:
-12272 -12273 -12274  0

c i = 4
c  -2+1 --> -1
c    ( b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧  p_56) -> ( b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0)
c  in CNF:
c    -b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨  b^{14, 5}_2
c    -b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_1
c    -b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨  b^{14, 5}_0
c  in DIMACS:
-12275 -12276  12277 -56  12278 0
-12275 -12276  12277 -56 -12279 0
-12275 -12276  12277 -56  12280 0

c  -1+1 --> 0
c    ( b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0 ∧  p_56) -> (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧ -b^{14, 5}_0)
c  in CNF:
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_2
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_1
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_0
c  in DIMACS:
-12275  12276 -12277 -56 -12278 0
-12275  12276 -12277 -56 -12279 0
-12275  12276 -12277 -56 -12280 0

c  0+1 --> 1
c    (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧  p_56) -> (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0)
c  in CNF:
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_2
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_1
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨  b^{14, 5}_0
c  in DIMACS:
 12275  12276  12277 -56 -12278 0
 12275  12276  12277 -56 -12279 0
 12275  12276  12277 -56  12280 0

c  1+1 --> 2
c    (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0 ∧  p_56) -> (-b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0)
c  in CNF:
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_2
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨  b^{14, 5}_1
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ -p_56 ∨ -b^{14, 5}_0
c  in DIMACS:
 12275  12276 -12277 -56 -12278 0
 12275  12276 -12277 -56  12279 0
 12275  12276 -12277 -56 -12280 0

c  2+1 --> break 
c    (-b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧  p_56) -> break
c  in CNF:
c     b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 12275 -12276  12277 -56 1162 0


c  2-1 --> 1
c    (-b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧ -p_56) -> (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0)
c  in CNF:
c     b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_2
c     b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_1
c     b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨  b^{14, 5}_0
c  in DIMACS:
 12275 -12276  12277  56 -12278 0
 12275 -12276  12277  56 -12279 0
 12275 -12276  12277  56  12280 0

c  1-1 --> 0
c    (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0 ∧ -p_56) -> (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧ -b^{14, 5}_0)
c  in CNF:
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_2
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_1
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_0
c  in DIMACS:
 12275  12276 -12277  56 -12278 0
 12275  12276 -12277  56 -12279 0
 12275  12276 -12277  56 -12280 0

c  0-1 --> -1
c    (-b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧ -p_56) -> ( b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0)
c  in CNF:
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨  b^{14, 5}_2
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_1
c     b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨  b^{14, 5}_0
c  in DIMACS:
 12275  12276  12277  56  12278 0
 12275  12276  12277  56 -12279 0
 12275  12276  12277  56  12280 0

c  -1-1 --> -2
c    ( b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧  b^{14, 4}_0 ∧ -p_56) -> ( b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0)
c  in CNF:
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨  b^{14, 5}_2
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨  b^{14, 5}_1
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨  p_56 ∨ -b^{14, 5}_0
c  in DIMACS:
-12275  12276 -12277  56  12278 0
-12275  12276 -12277  56  12279 0
-12275  12276 -12277  56 -12280 0

c  -2-1 --> break 
c    ( b^{14, 4}_2 ∧  b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨  b^{14, 4}_0 ∨  p_56 ∨ break
c  in DIMACS:
-12275 -12276  12277  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 4}_2 ∧ -b^{14, 4}_1 ∧ -b^{14, 4}_0 ∧ true) 
c  in CNF:
c    -b^{14, 4}_2 ∨  b^{14, 4}_1 ∨  b^{14, 4}_0 ∨ false 
c  in DIMACS:
-12275  12276  12277  0

c  3 does not represent an automaton state.
c    -(-b^{14, 4}_2 ∧  b^{14, 4}_1 ∧  b^{14, 4}_0 ∧ true) 
c  in CNF:
c     b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ false 
c  in DIMACS:
 12275 -12276 -12277  0
c  -3 does not represent an automaton state.
c    -( b^{14, 4}_2 ∧  b^{14, 4}_1 ∧  b^{14, 4}_0 ∧ true) 
c  in CNF:
c    -b^{14, 4}_2 ∨ -b^{14, 4}_1 ∨ -b^{14, 4}_0 ∨ false 
c  in DIMACS:
-12275 -12276 -12277  0

c i = 5
c  -2+1 --> -1
c    ( b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧  p_70) -> ( b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0)
c  in CNF:
c    -b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨  b^{14, 6}_2
c    -b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_1
c    -b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨  b^{14, 6}_0
c  in DIMACS:
-12278 -12279  12280 -70  12281 0
-12278 -12279  12280 -70 -12282 0
-12278 -12279  12280 -70  12283 0

c  -1+1 --> 0
c    ( b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0 ∧  p_70) -> (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧ -b^{14, 6}_0)
c  in CNF:
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_2
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_1
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_0
c  in DIMACS:
-12278  12279 -12280 -70 -12281 0
-12278  12279 -12280 -70 -12282 0
-12278  12279 -12280 -70 -12283 0

c  0+1 --> 1
c    (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧  p_70) -> (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0)
c  in CNF:
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_2
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_1
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨  b^{14, 6}_0
c  in DIMACS:
 12278  12279  12280 -70 -12281 0
 12278  12279  12280 -70 -12282 0
 12278  12279  12280 -70  12283 0

c  1+1 --> 2
c    (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0 ∧  p_70) -> (-b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0)
c  in CNF:
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_2
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨  b^{14, 6}_1
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ -p_70 ∨ -b^{14, 6}_0
c  in DIMACS:
 12278  12279 -12280 -70 -12281 0
 12278  12279 -12280 -70  12282 0
 12278  12279 -12280 -70 -12283 0

c  2+1 --> break 
c    (-b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧  p_70) -> break
c  in CNF:
c     b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 12278 -12279  12280 -70 1162 0


c  2-1 --> 1
c    (-b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧ -p_70) -> (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0)
c  in CNF:
c     b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_2
c     b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_1
c     b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨  b^{14, 6}_0
c  in DIMACS:
 12278 -12279  12280  70 -12281 0
 12278 -12279  12280  70 -12282 0
 12278 -12279  12280  70  12283 0

c  1-1 --> 0
c    (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0 ∧ -p_70) -> (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧ -b^{14, 6}_0)
c  in CNF:
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_2
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_1
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_0
c  in DIMACS:
 12278  12279 -12280  70 -12281 0
 12278  12279 -12280  70 -12282 0
 12278  12279 -12280  70 -12283 0

c  0-1 --> -1
c    (-b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧ -p_70) -> ( b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0)
c  in CNF:
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨  b^{14, 6}_2
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_1
c     b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨  b^{14, 6}_0
c  in DIMACS:
 12278  12279  12280  70  12281 0
 12278  12279  12280  70 -12282 0
 12278  12279  12280  70  12283 0

c  -1-1 --> -2
c    ( b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧  b^{14, 5}_0 ∧ -p_70) -> ( b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0)
c  in CNF:
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨  b^{14, 6}_2
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨  b^{14, 6}_1
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨  p_70 ∨ -b^{14, 6}_0
c  in DIMACS:
-12278  12279 -12280  70  12281 0
-12278  12279 -12280  70  12282 0
-12278  12279 -12280  70 -12283 0

c  -2-1 --> break 
c    ( b^{14, 5}_2 ∧  b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨  b^{14, 5}_0 ∨  p_70 ∨ break
c  in DIMACS:
-12278 -12279  12280  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 5}_2 ∧ -b^{14, 5}_1 ∧ -b^{14, 5}_0 ∧ true) 
c  in CNF:
c    -b^{14, 5}_2 ∨  b^{14, 5}_1 ∨  b^{14, 5}_0 ∨ false 
c  in DIMACS:
-12278  12279  12280  0

c  3 does not represent an automaton state.
c    -(-b^{14, 5}_2 ∧  b^{14, 5}_1 ∧  b^{14, 5}_0 ∧ true) 
c  in CNF:
c     b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ false 
c  in DIMACS:
 12278 -12279 -12280  0
c  -3 does not represent an automaton state.
c    -( b^{14, 5}_2 ∧  b^{14, 5}_1 ∧  b^{14, 5}_0 ∧ true) 
c  in CNF:
c    -b^{14, 5}_2 ∨ -b^{14, 5}_1 ∨ -b^{14, 5}_0 ∨ false 
c  in DIMACS:
-12278 -12279 -12280  0

c i = 6
c  -2+1 --> -1
c    ( b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧  p_84) -> ( b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0)
c  in CNF:
c    -b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨  b^{14, 7}_2
c    -b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_1
c    -b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨  b^{14, 7}_0
c  in DIMACS:
-12281 -12282  12283 -84  12284 0
-12281 -12282  12283 -84 -12285 0
-12281 -12282  12283 -84  12286 0

c  -1+1 --> 0
c    ( b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0 ∧  p_84) -> (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧ -b^{14, 7}_0)
c  in CNF:
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_2
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_1
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_0
c  in DIMACS:
-12281  12282 -12283 -84 -12284 0
-12281  12282 -12283 -84 -12285 0
-12281  12282 -12283 -84 -12286 0

c  0+1 --> 1
c    (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧  p_84) -> (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0)
c  in CNF:
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_2
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_1
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨  b^{14, 7}_0
c  in DIMACS:
 12281  12282  12283 -84 -12284 0
 12281  12282  12283 -84 -12285 0
 12281  12282  12283 -84  12286 0

c  1+1 --> 2
c    (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0 ∧  p_84) -> (-b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0)
c  in CNF:
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_2
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨  b^{14, 7}_1
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ -p_84 ∨ -b^{14, 7}_0
c  in DIMACS:
 12281  12282 -12283 -84 -12284 0
 12281  12282 -12283 -84  12285 0
 12281  12282 -12283 -84 -12286 0

c  2+1 --> break 
c    (-b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧  p_84) -> break
c  in CNF:
c     b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 12281 -12282  12283 -84 1162 0


c  2-1 --> 1
c    (-b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧ -p_84) -> (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0)
c  in CNF:
c     b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_2
c     b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_1
c     b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨  b^{14, 7}_0
c  in DIMACS:
 12281 -12282  12283  84 -12284 0
 12281 -12282  12283  84 -12285 0
 12281 -12282  12283  84  12286 0

c  1-1 --> 0
c    (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0 ∧ -p_84) -> (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧ -b^{14, 7}_0)
c  in CNF:
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_2
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_1
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_0
c  in DIMACS:
 12281  12282 -12283  84 -12284 0
 12281  12282 -12283  84 -12285 0
 12281  12282 -12283  84 -12286 0

c  0-1 --> -1
c    (-b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧ -p_84) -> ( b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0)
c  in CNF:
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨  b^{14, 7}_2
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_1
c     b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨  b^{14, 7}_0
c  in DIMACS:
 12281  12282  12283  84  12284 0
 12281  12282  12283  84 -12285 0
 12281  12282  12283  84  12286 0

c  -1-1 --> -2
c    ( b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧  b^{14, 6}_0 ∧ -p_84) -> ( b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0)
c  in CNF:
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨  b^{14, 7}_2
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨  b^{14, 7}_1
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨  p_84 ∨ -b^{14, 7}_0
c  in DIMACS:
-12281  12282 -12283  84  12284 0
-12281  12282 -12283  84  12285 0
-12281  12282 -12283  84 -12286 0

c  -2-1 --> break 
c    ( b^{14, 6}_2 ∧  b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨  b^{14, 6}_0 ∨  p_84 ∨ break
c  in DIMACS:
-12281 -12282  12283  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 6}_2 ∧ -b^{14, 6}_1 ∧ -b^{14, 6}_0 ∧ true) 
c  in CNF:
c    -b^{14, 6}_2 ∨  b^{14, 6}_1 ∨  b^{14, 6}_0 ∨ false 
c  in DIMACS:
-12281  12282  12283  0

c  3 does not represent an automaton state.
c    -(-b^{14, 6}_2 ∧  b^{14, 6}_1 ∧  b^{14, 6}_0 ∧ true) 
c  in CNF:
c     b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ false 
c  in DIMACS:
 12281 -12282 -12283  0
c  -3 does not represent an automaton state.
c    -( b^{14, 6}_2 ∧  b^{14, 6}_1 ∧  b^{14, 6}_0 ∧ true) 
c  in CNF:
c    -b^{14, 6}_2 ∨ -b^{14, 6}_1 ∨ -b^{14, 6}_0 ∨ false 
c  in DIMACS:
-12281 -12282 -12283  0

c i = 7
c  -2+1 --> -1
c    ( b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧  p_98) -> ( b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0)
c  in CNF:
c    -b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨  b^{14, 8}_2
c    -b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_1
c    -b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨  b^{14, 8}_0
c  in DIMACS:
-12284 -12285  12286 -98  12287 0
-12284 -12285  12286 -98 -12288 0
-12284 -12285  12286 -98  12289 0

c  -1+1 --> 0
c    ( b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0 ∧  p_98) -> (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧ -b^{14, 8}_0)
c  in CNF:
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_2
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_1
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_0
c  in DIMACS:
-12284  12285 -12286 -98 -12287 0
-12284  12285 -12286 -98 -12288 0
-12284  12285 -12286 -98 -12289 0

c  0+1 --> 1
c    (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧  p_98) -> (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0)
c  in CNF:
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_2
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_1
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨  b^{14, 8}_0
c  in DIMACS:
 12284  12285  12286 -98 -12287 0
 12284  12285  12286 -98 -12288 0
 12284  12285  12286 -98  12289 0

c  1+1 --> 2
c    (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0 ∧  p_98) -> (-b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0)
c  in CNF:
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_2
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨  b^{14, 8}_1
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ -p_98 ∨ -b^{14, 8}_0
c  in DIMACS:
 12284  12285 -12286 -98 -12287 0
 12284  12285 -12286 -98  12288 0
 12284  12285 -12286 -98 -12289 0

c  2+1 --> break 
c    (-b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧  p_98) -> break
c  in CNF:
c     b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 12284 -12285  12286 -98 1162 0


c  2-1 --> 1
c    (-b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧ -p_98) -> (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0)
c  in CNF:
c     b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_2
c     b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_1
c     b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨  b^{14, 8}_0
c  in DIMACS:
 12284 -12285  12286  98 -12287 0
 12284 -12285  12286  98 -12288 0
 12284 -12285  12286  98  12289 0

c  1-1 --> 0
c    (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0 ∧ -p_98) -> (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧ -b^{14, 8}_0)
c  in CNF:
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_2
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_1
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_0
c  in DIMACS:
 12284  12285 -12286  98 -12287 0
 12284  12285 -12286  98 -12288 0
 12284  12285 -12286  98 -12289 0

c  0-1 --> -1
c    (-b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧ -p_98) -> ( b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0)
c  in CNF:
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨  b^{14, 8}_2
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_1
c     b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨  b^{14, 8}_0
c  in DIMACS:
 12284  12285  12286  98  12287 0
 12284  12285  12286  98 -12288 0
 12284  12285  12286  98  12289 0

c  -1-1 --> -2
c    ( b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧  b^{14, 7}_0 ∧ -p_98) -> ( b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0)
c  in CNF:
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨  b^{14, 8}_2
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨  b^{14, 8}_1
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨  p_98 ∨ -b^{14, 8}_0
c  in DIMACS:
-12284  12285 -12286  98  12287 0
-12284  12285 -12286  98  12288 0
-12284  12285 -12286  98 -12289 0

c  -2-1 --> break 
c    ( b^{14, 7}_2 ∧  b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨  b^{14, 7}_0 ∨  p_98 ∨ break
c  in DIMACS:
-12284 -12285  12286  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 7}_2 ∧ -b^{14, 7}_1 ∧ -b^{14, 7}_0 ∧ true) 
c  in CNF:
c    -b^{14, 7}_2 ∨  b^{14, 7}_1 ∨  b^{14, 7}_0 ∨ false 
c  in DIMACS:
-12284  12285  12286  0

c  3 does not represent an automaton state.
c    -(-b^{14, 7}_2 ∧  b^{14, 7}_1 ∧  b^{14, 7}_0 ∧ true) 
c  in CNF:
c     b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ false 
c  in DIMACS:
 12284 -12285 -12286  0
c  -3 does not represent an automaton state.
c    -( b^{14, 7}_2 ∧  b^{14, 7}_1 ∧  b^{14, 7}_0 ∧ true) 
c  in CNF:
c    -b^{14, 7}_2 ∨ -b^{14, 7}_1 ∨ -b^{14, 7}_0 ∨ false 
c  in DIMACS:
-12284 -12285 -12286  0

c i = 8
c  -2+1 --> -1
c    ( b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧  p_112) -> ( b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0)
c  in CNF:
c    -b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨  b^{14, 9}_2
c    -b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_1
c    -b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨  b^{14, 9}_0
c  in DIMACS:
-12287 -12288  12289 -112  12290 0
-12287 -12288  12289 -112 -12291 0
-12287 -12288  12289 -112  12292 0

c  -1+1 --> 0
c    ( b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0 ∧  p_112) -> (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧ -b^{14, 9}_0)
c  in CNF:
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_2
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_1
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_0
c  in DIMACS:
-12287  12288 -12289 -112 -12290 0
-12287  12288 -12289 -112 -12291 0
-12287  12288 -12289 -112 -12292 0

c  0+1 --> 1
c    (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧  p_112) -> (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0)
c  in CNF:
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_2
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_1
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨  b^{14, 9}_0
c  in DIMACS:
 12287  12288  12289 -112 -12290 0
 12287  12288  12289 -112 -12291 0
 12287  12288  12289 -112  12292 0

c  1+1 --> 2
c    (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0 ∧  p_112) -> (-b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0)
c  in CNF:
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_2
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨  b^{14, 9}_1
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ -p_112 ∨ -b^{14, 9}_0
c  in DIMACS:
 12287  12288 -12289 -112 -12290 0
 12287  12288 -12289 -112  12291 0
 12287  12288 -12289 -112 -12292 0

c  2+1 --> break 
c    (-b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧  p_112) -> break
c  in CNF:
c     b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 12287 -12288  12289 -112 1162 0


c  2-1 --> 1
c    (-b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧ -p_112) -> (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0)
c  in CNF:
c     b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_2
c     b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_1
c     b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨  b^{14, 9}_0
c  in DIMACS:
 12287 -12288  12289  112 -12290 0
 12287 -12288  12289  112 -12291 0
 12287 -12288  12289  112  12292 0

c  1-1 --> 0
c    (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0 ∧ -p_112) -> (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧ -b^{14, 9}_0)
c  in CNF:
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_2
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_1
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_0
c  in DIMACS:
 12287  12288 -12289  112 -12290 0
 12287  12288 -12289  112 -12291 0
 12287  12288 -12289  112 -12292 0

c  0-1 --> -1
c    (-b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧ -p_112) -> ( b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0)
c  in CNF:
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨  b^{14, 9}_2
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_1
c     b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨  b^{14, 9}_0
c  in DIMACS:
 12287  12288  12289  112  12290 0
 12287  12288  12289  112 -12291 0
 12287  12288  12289  112  12292 0

c  -1-1 --> -2
c    ( b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧  b^{14, 8}_0 ∧ -p_112) -> ( b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0)
c  in CNF:
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨  b^{14, 9}_2
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨  b^{14, 9}_1
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨  p_112 ∨ -b^{14, 9}_0
c  in DIMACS:
-12287  12288 -12289  112  12290 0
-12287  12288 -12289  112  12291 0
-12287  12288 -12289  112 -12292 0

c  -2-1 --> break 
c    ( b^{14, 8}_2 ∧  b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨  b^{14, 8}_0 ∨  p_112 ∨ break
c  in DIMACS:
-12287 -12288  12289  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 8}_2 ∧ -b^{14, 8}_1 ∧ -b^{14, 8}_0 ∧ true) 
c  in CNF:
c    -b^{14, 8}_2 ∨  b^{14, 8}_1 ∨  b^{14, 8}_0 ∨ false 
c  in DIMACS:
-12287  12288  12289  0

c  3 does not represent an automaton state.
c    -(-b^{14, 8}_2 ∧  b^{14, 8}_1 ∧  b^{14, 8}_0 ∧ true) 
c  in CNF:
c     b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ false 
c  in DIMACS:
 12287 -12288 -12289  0
c  -3 does not represent an automaton state.
c    -( b^{14, 8}_2 ∧  b^{14, 8}_1 ∧  b^{14, 8}_0 ∧ true) 
c  in CNF:
c    -b^{14, 8}_2 ∨ -b^{14, 8}_1 ∨ -b^{14, 8}_0 ∨ false 
c  in DIMACS:
-12287 -12288 -12289  0

c i = 9
c  -2+1 --> -1
c    ( b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧  p_126) -> ( b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0)
c  in CNF:
c    -b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨  b^{14, 10}_2
c    -b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_1
c    -b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨  b^{14, 10}_0
c  in DIMACS:
-12290 -12291  12292 -126  12293 0
-12290 -12291  12292 -126 -12294 0
-12290 -12291  12292 -126  12295 0

c  -1+1 --> 0
c    ( b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0 ∧  p_126) -> (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧ -b^{14, 10}_0)
c  in CNF:
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_2
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_1
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_0
c  in DIMACS:
-12290  12291 -12292 -126 -12293 0
-12290  12291 -12292 -126 -12294 0
-12290  12291 -12292 -126 -12295 0

c  0+1 --> 1
c    (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧  p_126) -> (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0)
c  in CNF:
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_2
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_1
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨  b^{14, 10}_0
c  in DIMACS:
 12290  12291  12292 -126 -12293 0
 12290  12291  12292 -126 -12294 0
 12290  12291  12292 -126  12295 0

c  1+1 --> 2
c    (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0 ∧  p_126) -> (-b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0)
c  in CNF:
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_2
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨  b^{14, 10}_1
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ -p_126 ∨ -b^{14, 10}_0
c  in DIMACS:
 12290  12291 -12292 -126 -12293 0
 12290  12291 -12292 -126  12294 0
 12290  12291 -12292 -126 -12295 0

c  2+1 --> break 
c    (-b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧  p_126) -> break
c  in CNF:
c     b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 12290 -12291  12292 -126 1162 0


c  2-1 --> 1
c    (-b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧ -p_126) -> (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0)
c  in CNF:
c     b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_2
c     b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_1
c     b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨  b^{14, 10}_0
c  in DIMACS:
 12290 -12291  12292  126 -12293 0
 12290 -12291  12292  126 -12294 0
 12290 -12291  12292  126  12295 0

c  1-1 --> 0
c    (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0 ∧ -p_126) -> (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧ -b^{14, 10}_0)
c  in CNF:
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_2
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_1
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_0
c  in DIMACS:
 12290  12291 -12292  126 -12293 0
 12290  12291 -12292  126 -12294 0
 12290  12291 -12292  126 -12295 0

c  0-1 --> -1
c    (-b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧ -p_126) -> ( b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0)
c  in CNF:
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨  b^{14, 10}_2
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_1
c     b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨  b^{14, 10}_0
c  in DIMACS:
 12290  12291  12292  126  12293 0
 12290  12291  12292  126 -12294 0
 12290  12291  12292  126  12295 0

c  -1-1 --> -2
c    ( b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧  b^{14, 9}_0 ∧ -p_126) -> ( b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0)
c  in CNF:
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨  b^{14, 10}_2
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨  b^{14, 10}_1
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨  p_126 ∨ -b^{14, 10}_0
c  in DIMACS:
-12290  12291 -12292  126  12293 0
-12290  12291 -12292  126  12294 0
-12290  12291 -12292  126 -12295 0

c  -2-1 --> break 
c    ( b^{14, 9}_2 ∧  b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨  b^{14, 9}_0 ∨  p_126 ∨ break
c  in DIMACS:
-12290 -12291  12292  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 9}_2 ∧ -b^{14, 9}_1 ∧ -b^{14, 9}_0 ∧ true) 
c  in CNF:
c    -b^{14, 9}_2 ∨  b^{14, 9}_1 ∨  b^{14, 9}_0 ∨ false 
c  in DIMACS:
-12290  12291  12292  0

c  3 does not represent an automaton state.
c    -(-b^{14, 9}_2 ∧  b^{14, 9}_1 ∧  b^{14, 9}_0 ∧ true) 
c  in CNF:
c     b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ false 
c  in DIMACS:
 12290 -12291 -12292  0
c  -3 does not represent an automaton state.
c    -( b^{14, 9}_2 ∧  b^{14, 9}_1 ∧  b^{14, 9}_0 ∧ true) 
c  in CNF:
c    -b^{14, 9}_2 ∨ -b^{14, 9}_1 ∨ -b^{14, 9}_0 ∨ false 
c  in DIMACS:
-12290 -12291 -12292  0

c i = 10
c  -2+1 --> -1
c    ( b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧  p_140) -> ( b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0)
c  in CNF:
c    -b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨  b^{14, 11}_2
c    -b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_1
c    -b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨  b^{14, 11}_0
c  in DIMACS:
-12293 -12294  12295 -140  12296 0
-12293 -12294  12295 -140 -12297 0
-12293 -12294  12295 -140  12298 0

c  -1+1 --> 0
c    ( b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0 ∧  p_140) -> (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧ -b^{14, 11}_0)
c  in CNF:
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_2
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_1
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_0
c  in DIMACS:
-12293  12294 -12295 -140 -12296 0
-12293  12294 -12295 -140 -12297 0
-12293  12294 -12295 -140 -12298 0

c  0+1 --> 1
c    (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧  p_140) -> (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0)
c  in CNF:
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_2
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_1
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨  b^{14, 11}_0
c  in DIMACS:
 12293  12294  12295 -140 -12296 0
 12293  12294  12295 -140 -12297 0
 12293  12294  12295 -140  12298 0

c  1+1 --> 2
c    (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0 ∧  p_140) -> (-b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0)
c  in CNF:
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_2
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨  b^{14, 11}_1
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ -p_140 ∨ -b^{14, 11}_0
c  in DIMACS:
 12293  12294 -12295 -140 -12296 0
 12293  12294 -12295 -140  12297 0
 12293  12294 -12295 -140 -12298 0

c  2+1 --> break 
c    (-b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧  p_140) -> break
c  in CNF:
c     b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 12293 -12294  12295 -140 1162 0


c  2-1 --> 1
c    (-b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧ -p_140) -> (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0)
c  in CNF:
c     b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_2
c     b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_1
c     b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨  b^{14, 11}_0
c  in DIMACS:
 12293 -12294  12295  140 -12296 0
 12293 -12294  12295  140 -12297 0
 12293 -12294  12295  140  12298 0

c  1-1 --> 0
c    (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0 ∧ -p_140) -> (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧ -b^{14, 11}_0)
c  in CNF:
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_2
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_1
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_0
c  in DIMACS:
 12293  12294 -12295  140 -12296 0
 12293  12294 -12295  140 -12297 0
 12293  12294 -12295  140 -12298 0

c  0-1 --> -1
c    (-b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧ -p_140) -> ( b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0)
c  in CNF:
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨  b^{14, 11}_2
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_1
c     b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨  b^{14, 11}_0
c  in DIMACS:
 12293  12294  12295  140  12296 0
 12293  12294  12295  140 -12297 0
 12293  12294  12295  140  12298 0

c  -1-1 --> -2
c    ( b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧  b^{14, 10}_0 ∧ -p_140) -> ( b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0)
c  in CNF:
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨  b^{14, 11}_2
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨  b^{14, 11}_1
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨  p_140 ∨ -b^{14, 11}_0
c  in DIMACS:
-12293  12294 -12295  140  12296 0
-12293  12294 -12295  140  12297 0
-12293  12294 -12295  140 -12298 0

c  -2-1 --> break 
c    ( b^{14, 10}_2 ∧  b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨  b^{14, 10}_0 ∨  p_140 ∨ break
c  in DIMACS:
-12293 -12294  12295  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 10}_2 ∧ -b^{14, 10}_1 ∧ -b^{14, 10}_0 ∧ true) 
c  in CNF:
c    -b^{14, 10}_2 ∨  b^{14, 10}_1 ∨  b^{14, 10}_0 ∨ false 
c  in DIMACS:
-12293  12294  12295  0

c  3 does not represent an automaton state.
c    -(-b^{14, 10}_2 ∧  b^{14, 10}_1 ∧  b^{14, 10}_0 ∧ true) 
c  in CNF:
c     b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ false 
c  in DIMACS:
 12293 -12294 -12295  0
c  -3 does not represent an automaton state.
c    -( b^{14, 10}_2 ∧  b^{14, 10}_1 ∧  b^{14, 10}_0 ∧ true) 
c  in CNF:
c    -b^{14, 10}_2 ∨ -b^{14, 10}_1 ∨ -b^{14, 10}_0 ∨ false 
c  in DIMACS:
-12293 -12294 -12295  0

c i = 11
c  -2+1 --> -1
c    ( b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧  p_154) -> ( b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0)
c  in CNF:
c    -b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨  b^{14, 12}_2
c    -b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_1
c    -b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨  b^{14, 12}_0
c  in DIMACS:
-12296 -12297  12298 -154  12299 0
-12296 -12297  12298 -154 -12300 0
-12296 -12297  12298 -154  12301 0

c  -1+1 --> 0
c    ( b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0 ∧  p_154) -> (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧ -b^{14, 12}_0)
c  in CNF:
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_2
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_1
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_0
c  in DIMACS:
-12296  12297 -12298 -154 -12299 0
-12296  12297 -12298 -154 -12300 0
-12296  12297 -12298 -154 -12301 0

c  0+1 --> 1
c    (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧  p_154) -> (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0)
c  in CNF:
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_2
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_1
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨  b^{14, 12}_0
c  in DIMACS:
 12296  12297  12298 -154 -12299 0
 12296  12297  12298 -154 -12300 0
 12296  12297  12298 -154  12301 0

c  1+1 --> 2
c    (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0 ∧  p_154) -> (-b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0)
c  in CNF:
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_2
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨  b^{14, 12}_1
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ -p_154 ∨ -b^{14, 12}_0
c  in DIMACS:
 12296  12297 -12298 -154 -12299 0
 12296  12297 -12298 -154  12300 0
 12296  12297 -12298 -154 -12301 0

c  2+1 --> break 
c    (-b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧  p_154) -> break
c  in CNF:
c     b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 12296 -12297  12298 -154 1162 0


c  2-1 --> 1
c    (-b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧ -p_154) -> (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0)
c  in CNF:
c     b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_2
c     b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_1
c     b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨  b^{14, 12}_0
c  in DIMACS:
 12296 -12297  12298  154 -12299 0
 12296 -12297  12298  154 -12300 0
 12296 -12297  12298  154  12301 0

c  1-1 --> 0
c    (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0 ∧ -p_154) -> (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧ -b^{14, 12}_0)
c  in CNF:
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_2
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_1
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_0
c  in DIMACS:
 12296  12297 -12298  154 -12299 0
 12296  12297 -12298  154 -12300 0
 12296  12297 -12298  154 -12301 0

c  0-1 --> -1
c    (-b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧ -p_154) -> ( b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0)
c  in CNF:
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨  b^{14, 12}_2
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_1
c     b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨  b^{14, 12}_0
c  in DIMACS:
 12296  12297  12298  154  12299 0
 12296  12297  12298  154 -12300 0
 12296  12297  12298  154  12301 0

c  -1-1 --> -2
c    ( b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧  b^{14, 11}_0 ∧ -p_154) -> ( b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0)
c  in CNF:
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨  b^{14, 12}_2
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨  b^{14, 12}_1
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨  p_154 ∨ -b^{14, 12}_0
c  in DIMACS:
-12296  12297 -12298  154  12299 0
-12296  12297 -12298  154  12300 0
-12296  12297 -12298  154 -12301 0

c  -2-1 --> break 
c    ( b^{14, 11}_2 ∧  b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨  b^{14, 11}_0 ∨  p_154 ∨ break
c  in DIMACS:
-12296 -12297  12298  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 11}_2 ∧ -b^{14, 11}_1 ∧ -b^{14, 11}_0 ∧ true) 
c  in CNF:
c    -b^{14, 11}_2 ∨  b^{14, 11}_1 ∨  b^{14, 11}_0 ∨ false 
c  in DIMACS:
-12296  12297  12298  0

c  3 does not represent an automaton state.
c    -(-b^{14, 11}_2 ∧  b^{14, 11}_1 ∧  b^{14, 11}_0 ∧ true) 
c  in CNF:
c     b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ false 
c  in DIMACS:
 12296 -12297 -12298  0
c  -3 does not represent an automaton state.
c    -( b^{14, 11}_2 ∧  b^{14, 11}_1 ∧  b^{14, 11}_0 ∧ true) 
c  in CNF:
c    -b^{14, 11}_2 ∨ -b^{14, 11}_1 ∨ -b^{14, 11}_0 ∨ false 
c  in DIMACS:
-12296 -12297 -12298  0

c i = 12
c  -2+1 --> -1
c    ( b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧  p_168) -> ( b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0)
c  in CNF:
c    -b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨  b^{14, 13}_2
c    -b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_1
c    -b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨  b^{14, 13}_0
c  in DIMACS:
-12299 -12300  12301 -168  12302 0
-12299 -12300  12301 -168 -12303 0
-12299 -12300  12301 -168  12304 0

c  -1+1 --> 0
c    ( b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0 ∧  p_168) -> (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧ -b^{14, 13}_0)
c  in CNF:
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_2
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_1
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_0
c  in DIMACS:
-12299  12300 -12301 -168 -12302 0
-12299  12300 -12301 -168 -12303 0
-12299  12300 -12301 -168 -12304 0

c  0+1 --> 1
c    (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧  p_168) -> (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0)
c  in CNF:
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_2
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_1
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨  b^{14, 13}_0
c  in DIMACS:
 12299  12300  12301 -168 -12302 0
 12299  12300  12301 -168 -12303 0
 12299  12300  12301 -168  12304 0

c  1+1 --> 2
c    (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0 ∧  p_168) -> (-b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0)
c  in CNF:
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_2
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨  b^{14, 13}_1
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ -p_168 ∨ -b^{14, 13}_0
c  in DIMACS:
 12299  12300 -12301 -168 -12302 0
 12299  12300 -12301 -168  12303 0
 12299  12300 -12301 -168 -12304 0

c  2+1 --> break 
c    (-b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧  p_168) -> break
c  in CNF:
c     b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 12299 -12300  12301 -168 1162 0


c  2-1 --> 1
c    (-b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧ -p_168) -> (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0)
c  in CNF:
c     b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_2
c     b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_1
c     b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨  b^{14, 13}_0
c  in DIMACS:
 12299 -12300  12301  168 -12302 0
 12299 -12300  12301  168 -12303 0
 12299 -12300  12301  168  12304 0

c  1-1 --> 0
c    (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0 ∧ -p_168) -> (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧ -b^{14, 13}_0)
c  in CNF:
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_2
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_1
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_0
c  in DIMACS:
 12299  12300 -12301  168 -12302 0
 12299  12300 -12301  168 -12303 0
 12299  12300 -12301  168 -12304 0

c  0-1 --> -1
c    (-b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧ -p_168) -> ( b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0)
c  in CNF:
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨  b^{14, 13}_2
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_1
c     b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨  b^{14, 13}_0
c  in DIMACS:
 12299  12300  12301  168  12302 0
 12299  12300  12301  168 -12303 0
 12299  12300  12301  168  12304 0

c  -1-1 --> -2
c    ( b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧  b^{14, 12}_0 ∧ -p_168) -> ( b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0)
c  in CNF:
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨  b^{14, 13}_2
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨  b^{14, 13}_1
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨  p_168 ∨ -b^{14, 13}_0
c  in DIMACS:
-12299  12300 -12301  168  12302 0
-12299  12300 -12301  168  12303 0
-12299  12300 -12301  168 -12304 0

c  -2-1 --> break 
c    ( b^{14, 12}_2 ∧  b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨  b^{14, 12}_0 ∨  p_168 ∨ break
c  in DIMACS:
-12299 -12300  12301  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 12}_2 ∧ -b^{14, 12}_1 ∧ -b^{14, 12}_0 ∧ true) 
c  in CNF:
c    -b^{14, 12}_2 ∨  b^{14, 12}_1 ∨  b^{14, 12}_0 ∨ false 
c  in DIMACS:
-12299  12300  12301  0

c  3 does not represent an automaton state.
c    -(-b^{14, 12}_2 ∧  b^{14, 12}_1 ∧  b^{14, 12}_0 ∧ true) 
c  in CNF:
c     b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ false 
c  in DIMACS:
 12299 -12300 -12301  0
c  -3 does not represent an automaton state.
c    -( b^{14, 12}_2 ∧  b^{14, 12}_1 ∧  b^{14, 12}_0 ∧ true) 
c  in CNF:
c    -b^{14, 12}_2 ∨ -b^{14, 12}_1 ∨ -b^{14, 12}_0 ∨ false 
c  in DIMACS:
-12299 -12300 -12301  0

c i = 13
c  -2+1 --> -1
c    ( b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧  p_182) -> ( b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0)
c  in CNF:
c    -b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨  b^{14, 14}_2
c    -b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_1
c    -b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨  b^{14, 14}_0
c  in DIMACS:
-12302 -12303  12304 -182  12305 0
-12302 -12303  12304 -182 -12306 0
-12302 -12303  12304 -182  12307 0

c  -1+1 --> 0
c    ( b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0 ∧  p_182) -> (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧ -b^{14, 14}_0)
c  in CNF:
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_2
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_1
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_0
c  in DIMACS:
-12302  12303 -12304 -182 -12305 0
-12302  12303 -12304 -182 -12306 0
-12302  12303 -12304 -182 -12307 0

c  0+1 --> 1
c    (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧  p_182) -> (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0)
c  in CNF:
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_2
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_1
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨  b^{14, 14}_0
c  in DIMACS:
 12302  12303  12304 -182 -12305 0
 12302  12303  12304 -182 -12306 0
 12302  12303  12304 -182  12307 0

c  1+1 --> 2
c    (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0 ∧  p_182) -> (-b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0)
c  in CNF:
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_2
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨  b^{14, 14}_1
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ -p_182 ∨ -b^{14, 14}_0
c  in DIMACS:
 12302  12303 -12304 -182 -12305 0
 12302  12303 -12304 -182  12306 0
 12302  12303 -12304 -182 -12307 0

c  2+1 --> break 
c    (-b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧  p_182) -> break
c  in CNF:
c     b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 12302 -12303  12304 -182 1162 0


c  2-1 --> 1
c    (-b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧ -p_182) -> (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0)
c  in CNF:
c     b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_2
c     b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_1
c     b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨  b^{14, 14}_0
c  in DIMACS:
 12302 -12303  12304  182 -12305 0
 12302 -12303  12304  182 -12306 0
 12302 -12303  12304  182  12307 0

c  1-1 --> 0
c    (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0 ∧ -p_182) -> (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧ -b^{14, 14}_0)
c  in CNF:
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_2
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_1
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_0
c  in DIMACS:
 12302  12303 -12304  182 -12305 0
 12302  12303 -12304  182 -12306 0
 12302  12303 -12304  182 -12307 0

c  0-1 --> -1
c    (-b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧ -p_182) -> ( b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0)
c  in CNF:
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨  b^{14, 14}_2
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_1
c     b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨  b^{14, 14}_0
c  in DIMACS:
 12302  12303  12304  182  12305 0
 12302  12303  12304  182 -12306 0
 12302  12303  12304  182  12307 0

c  -1-1 --> -2
c    ( b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧  b^{14, 13}_0 ∧ -p_182) -> ( b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0)
c  in CNF:
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨  b^{14, 14}_2
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨  b^{14, 14}_1
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨  p_182 ∨ -b^{14, 14}_0
c  in DIMACS:
-12302  12303 -12304  182  12305 0
-12302  12303 -12304  182  12306 0
-12302  12303 -12304  182 -12307 0

c  -2-1 --> break 
c    ( b^{14, 13}_2 ∧  b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨  b^{14, 13}_0 ∨  p_182 ∨ break
c  in DIMACS:
-12302 -12303  12304  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 13}_2 ∧ -b^{14, 13}_1 ∧ -b^{14, 13}_0 ∧ true) 
c  in CNF:
c    -b^{14, 13}_2 ∨  b^{14, 13}_1 ∨  b^{14, 13}_0 ∨ false 
c  in DIMACS:
-12302  12303  12304  0

c  3 does not represent an automaton state.
c    -(-b^{14, 13}_2 ∧  b^{14, 13}_1 ∧  b^{14, 13}_0 ∧ true) 
c  in CNF:
c     b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ false 
c  in DIMACS:
 12302 -12303 -12304  0
c  -3 does not represent an automaton state.
c    -( b^{14, 13}_2 ∧  b^{14, 13}_1 ∧  b^{14, 13}_0 ∧ true) 
c  in CNF:
c    -b^{14, 13}_2 ∨ -b^{14, 13}_1 ∨ -b^{14, 13}_0 ∨ false 
c  in DIMACS:
-12302 -12303 -12304  0

c i = 14
c  -2+1 --> -1
c    ( b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧  p_196) -> ( b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0)
c  in CNF:
c    -b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨  b^{14, 15}_2
c    -b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_1
c    -b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨  b^{14, 15}_0
c  in DIMACS:
-12305 -12306  12307 -196  12308 0
-12305 -12306  12307 -196 -12309 0
-12305 -12306  12307 -196  12310 0

c  -1+1 --> 0
c    ( b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0 ∧  p_196) -> (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧ -b^{14, 15}_0)
c  in CNF:
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_2
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_1
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_0
c  in DIMACS:
-12305  12306 -12307 -196 -12308 0
-12305  12306 -12307 -196 -12309 0
-12305  12306 -12307 -196 -12310 0

c  0+1 --> 1
c    (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧  p_196) -> (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0)
c  in CNF:
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_2
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_1
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨  b^{14, 15}_0
c  in DIMACS:
 12305  12306  12307 -196 -12308 0
 12305  12306  12307 -196 -12309 0
 12305  12306  12307 -196  12310 0

c  1+1 --> 2
c    (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0 ∧  p_196) -> (-b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0)
c  in CNF:
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_2
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨  b^{14, 15}_1
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ -p_196 ∨ -b^{14, 15}_0
c  in DIMACS:
 12305  12306 -12307 -196 -12308 0
 12305  12306 -12307 -196  12309 0
 12305  12306 -12307 -196 -12310 0

c  2+1 --> break 
c    (-b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧  p_196) -> break
c  in CNF:
c     b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 12305 -12306  12307 -196 1162 0


c  2-1 --> 1
c    (-b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧ -p_196) -> (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0)
c  in CNF:
c     b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_2
c     b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_1
c     b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨  b^{14, 15}_0
c  in DIMACS:
 12305 -12306  12307  196 -12308 0
 12305 -12306  12307  196 -12309 0
 12305 -12306  12307  196  12310 0

c  1-1 --> 0
c    (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0 ∧ -p_196) -> (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧ -b^{14, 15}_0)
c  in CNF:
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_2
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_1
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_0
c  in DIMACS:
 12305  12306 -12307  196 -12308 0
 12305  12306 -12307  196 -12309 0
 12305  12306 -12307  196 -12310 0

c  0-1 --> -1
c    (-b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧ -p_196) -> ( b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0)
c  in CNF:
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨  b^{14, 15}_2
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_1
c     b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨  b^{14, 15}_0
c  in DIMACS:
 12305  12306  12307  196  12308 0
 12305  12306  12307  196 -12309 0
 12305  12306  12307  196  12310 0

c  -1-1 --> -2
c    ( b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧  b^{14, 14}_0 ∧ -p_196) -> ( b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0)
c  in CNF:
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨  b^{14, 15}_2
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨  b^{14, 15}_1
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨  p_196 ∨ -b^{14, 15}_0
c  in DIMACS:
-12305  12306 -12307  196  12308 0
-12305  12306 -12307  196  12309 0
-12305  12306 -12307  196 -12310 0

c  -2-1 --> break 
c    ( b^{14, 14}_2 ∧  b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨  b^{14, 14}_0 ∨  p_196 ∨ break
c  in DIMACS:
-12305 -12306  12307  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 14}_2 ∧ -b^{14, 14}_1 ∧ -b^{14, 14}_0 ∧ true) 
c  in CNF:
c    -b^{14, 14}_2 ∨  b^{14, 14}_1 ∨  b^{14, 14}_0 ∨ false 
c  in DIMACS:
-12305  12306  12307  0

c  3 does not represent an automaton state.
c    -(-b^{14, 14}_2 ∧  b^{14, 14}_1 ∧  b^{14, 14}_0 ∧ true) 
c  in CNF:
c     b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ false 
c  in DIMACS:
 12305 -12306 -12307  0
c  -3 does not represent an automaton state.
c    -( b^{14, 14}_2 ∧  b^{14, 14}_1 ∧  b^{14, 14}_0 ∧ true) 
c  in CNF:
c    -b^{14, 14}_2 ∨ -b^{14, 14}_1 ∨ -b^{14, 14}_0 ∨ false 
c  in DIMACS:
-12305 -12306 -12307  0

c i = 15
c  -2+1 --> -1
c    ( b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧  p_210) -> ( b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0)
c  in CNF:
c    -b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨  b^{14, 16}_2
c    -b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_1
c    -b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨  b^{14, 16}_0
c  in DIMACS:
-12308 -12309  12310 -210  12311 0
-12308 -12309  12310 -210 -12312 0
-12308 -12309  12310 -210  12313 0

c  -1+1 --> 0
c    ( b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0 ∧  p_210) -> (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧ -b^{14, 16}_0)
c  in CNF:
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_2
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_1
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_0
c  in DIMACS:
-12308  12309 -12310 -210 -12311 0
-12308  12309 -12310 -210 -12312 0
-12308  12309 -12310 -210 -12313 0

c  0+1 --> 1
c    (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧  p_210) -> (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0)
c  in CNF:
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_2
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_1
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨  b^{14, 16}_0
c  in DIMACS:
 12308  12309  12310 -210 -12311 0
 12308  12309  12310 -210 -12312 0
 12308  12309  12310 -210  12313 0

c  1+1 --> 2
c    (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0 ∧  p_210) -> (-b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0)
c  in CNF:
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_2
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨  b^{14, 16}_1
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ -p_210 ∨ -b^{14, 16}_0
c  in DIMACS:
 12308  12309 -12310 -210 -12311 0
 12308  12309 -12310 -210  12312 0
 12308  12309 -12310 -210 -12313 0

c  2+1 --> break 
c    (-b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧  p_210) -> break
c  in CNF:
c     b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 12308 -12309  12310 -210 1162 0


c  2-1 --> 1
c    (-b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧ -p_210) -> (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0)
c  in CNF:
c     b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_2
c     b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_1
c     b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨  b^{14, 16}_0
c  in DIMACS:
 12308 -12309  12310  210 -12311 0
 12308 -12309  12310  210 -12312 0
 12308 -12309  12310  210  12313 0

c  1-1 --> 0
c    (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0 ∧ -p_210) -> (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧ -b^{14, 16}_0)
c  in CNF:
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_2
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_1
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_0
c  in DIMACS:
 12308  12309 -12310  210 -12311 0
 12308  12309 -12310  210 -12312 0
 12308  12309 -12310  210 -12313 0

c  0-1 --> -1
c    (-b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧ -p_210) -> ( b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0)
c  in CNF:
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨  b^{14, 16}_2
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_1
c     b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨  b^{14, 16}_0
c  in DIMACS:
 12308  12309  12310  210  12311 0
 12308  12309  12310  210 -12312 0
 12308  12309  12310  210  12313 0

c  -1-1 --> -2
c    ( b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧  b^{14, 15}_0 ∧ -p_210) -> ( b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0)
c  in CNF:
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨  b^{14, 16}_2
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨  b^{14, 16}_1
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨  p_210 ∨ -b^{14, 16}_0
c  in DIMACS:
-12308  12309 -12310  210  12311 0
-12308  12309 -12310  210  12312 0
-12308  12309 -12310  210 -12313 0

c  -2-1 --> break 
c    ( b^{14, 15}_2 ∧  b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨  b^{14, 15}_0 ∨  p_210 ∨ break
c  in DIMACS:
-12308 -12309  12310  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 15}_2 ∧ -b^{14, 15}_1 ∧ -b^{14, 15}_0 ∧ true) 
c  in CNF:
c    -b^{14, 15}_2 ∨  b^{14, 15}_1 ∨  b^{14, 15}_0 ∨ false 
c  in DIMACS:
-12308  12309  12310  0

c  3 does not represent an automaton state.
c    -(-b^{14, 15}_2 ∧  b^{14, 15}_1 ∧  b^{14, 15}_0 ∧ true) 
c  in CNF:
c     b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ false 
c  in DIMACS:
 12308 -12309 -12310  0
c  -3 does not represent an automaton state.
c    -( b^{14, 15}_2 ∧  b^{14, 15}_1 ∧  b^{14, 15}_0 ∧ true) 
c  in CNF:
c    -b^{14, 15}_2 ∨ -b^{14, 15}_1 ∨ -b^{14, 15}_0 ∨ false 
c  in DIMACS:
-12308 -12309 -12310  0

c i = 16
c  -2+1 --> -1
c    ( b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧  p_224) -> ( b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0)
c  in CNF:
c    -b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨  b^{14, 17}_2
c    -b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_1
c    -b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨  b^{14, 17}_0
c  in DIMACS:
-12311 -12312  12313 -224  12314 0
-12311 -12312  12313 -224 -12315 0
-12311 -12312  12313 -224  12316 0

c  -1+1 --> 0
c    ( b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0 ∧  p_224) -> (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧ -b^{14, 17}_0)
c  in CNF:
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_2
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_1
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_0
c  in DIMACS:
-12311  12312 -12313 -224 -12314 0
-12311  12312 -12313 -224 -12315 0
-12311  12312 -12313 -224 -12316 0

c  0+1 --> 1
c    (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧  p_224) -> (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0)
c  in CNF:
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_2
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_1
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨  b^{14, 17}_0
c  in DIMACS:
 12311  12312  12313 -224 -12314 0
 12311  12312  12313 -224 -12315 0
 12311  12312  12313 -224  12316 0

c  1+1 --> 2
c    (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0 ∧  p_224) -> (-b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0)
c  in CNF:
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_2
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨  b^{14, 17}_1
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ -p_224 ∨ -b^{14, 17}_0
c  in DIMACS:
 12311  12312 -12313 -224 -12314 0
 12311  12312 -12313 -224  12315 0
 12311  12312 -12313 -224 -12316 0

c  2+1 --> break 
c    (-b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧  p_224) -> break
c  in CNF:
c     b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 12311 -12312  12313 -224 1162 0


c  2-1 --> 1
c    (-b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧ -p_224) -> (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0)
c  in CNF:
c     b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_2
c     b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_1
c     b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨  b^{14, 17}_0
c  in DIMACS:
 12311 -12312  12313  224 -12314 0
 12311 -12312  12313  224 -12315 0
 12311 -12312  12313  224  12316 0

c  1-1 --> 0
c    (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0 ∧ -p_224) -> (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧ -b^{14, 17}_0)
c  in CNF:
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_2
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_1
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_0
c  in DIMACS:
 12311  12312 -12313  224 -12314 0
 12311  12312 -12313  224 -12315 0
 12311  12312 -12313  224 -12316 0

c  0-1 --> -1
c    (-b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧ -p_224) -> ( b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0)
c  in CNF:
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨  b^{14, 17}_2
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_1
c     b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨  b^{14, 17}_0
c  in DIMACS:
 12311  12312  12313  224  12314 0
 12311  12312  12313  224 -12315 0
 12311  12312  12313  224  12316 0

c  -1-1 --> -2
c    ( b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧  b^{14, 16}_0 ∧ -p_224) -> ( b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0)
c  in CNF:
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨  b^{14, 17}_2
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨  b^{14, 17}_1
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨  p_224 ∨ -b^{14, 17}_0
c  in DIMACS:
-12311  12312 -12313  224  12314 0
-12311  12312 -12313  224  12315 0
-12311  12312 -12313  224 -12316 0

c  -2-1 --> break 
c    ( b^{14, 16}_2 ∧  b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨  b^{14, 16}_0 ∨  p_224 ∨ break
c  in DIMACS:
-12311 -12312  12313  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 16}_2 ∧ -b^{14, 16}_1 ∧ -b^{14, 16}_0 ∧ true) 
c  in CNF:
c    -b^{14, 16}_2 ∨  b^{14, 16}_1 ∨  b^{14, 16}_0 ∨ false 
c  in DIMACS:
-12311  12312  12313  0

c  3 does not represent an automaton state.
c    -(-b^{14, 16}_2 ∧  b^{14, 16}_1 ∧  b^{14, 16}_0 ∧ true) 
c  in CNF:
c     b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ false 
c  in DIMACS:
 12311 -12312 -12313  0
c  -3 does not represent an automaton state.
c    -( b^{14, 16}_2 ∧  b^{14, 16}_1 ∧  b^{14, 16}_0 ∧ true) 
c  in CNF:
c    -b^{14, 16}_2 ∨ -b^{14, 16}_1 ∨ -b^{14, 16}_0 ∨ false 
c  in DIMACS:
-12311 -12312 -12313  0

c i = 17
c  -2+1 --> -1
c    ( b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧  p_238) -> ( b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0)
c  in CNF:
c    -b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨  b^{14, 18}_2
c    -b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_1
c    -b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨  b^{14, 18}_0
c  in DIMACS:
-12314 -12315  12316 -238  12317 0
-12314 -12315  12316 -238 -12318 0
-12314 -12315  12316 -238  12319 0

c  -1+1 --> 0
c    ( b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0 ∧  p_238) -> (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧ -b^{14, 18}_0)
c  in CNF:
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_2
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_1
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_0
c  in DIMACS:
-12314  12315 -12316 -238 -12317 0
-12314  12315 -12316 -238 -12318 0
-12314  12315 -12316 -238 -12319 0

c  0+1 --> 1
c    (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧  p_238) -> (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0)
c  in CNF:
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_2
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_1
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨  b^{14, 18}_0
c  in DIMACS:
 12314  12315  12316 -238 -12317 0
 12314  12315  12316 -238 -12318 0
 12314  12315  12316 -238  12319 0

c  1+1 --> 2
c    (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0 ∧  p_238) -> (-b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0)
c  in CNF:
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_2
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨  b^{14, 18}_1
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ -p_238 ∨ -b^{14, 18}_0
c  in DIMACS:
 12314  12315 -12316 -238 -12317 0
 12314  12315 -12316 -238  12318 0
 12314  12315 -12316 -238 -12319 0

c  2+1 --> break 
c    (-b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧  p_238) -> break
c  in CNF:
c     b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 12314 -12315  12316 -238 1162 0


c  2-1 --> 1
c    (-b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧ -p_238) -> (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0)
c  in CNF:
c     b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_2
c     b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_1
c     b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨  b^{14, 18}_0
c  in DIMACS:
 12314 -12315  12316  238 -12317 0
 12314 -12315  12316  238 -12318 0
 12314 -12315  12316  238  12319 0

c  1-1 --> 0
c    (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0 ∧ -p_238) -> (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧ -b^{14, 18}_0)
c  in CNF:
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_2
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_1
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_0
c  in DIMACS:
 12314  12315 -12316  238 -12317 0
 12314  12315 -12316  238 -12318 0
 12314  12315 -12316  238 -12319 0

c  0-1 --> -1
c    (-b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧ -p_238) -> ( b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0)
c  in CNF:
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨  b^{14, 18}_2
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_1
c     b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨  b^{14, 18}_0
c  in DIMACS:
 12314  12315  12316  238  12317 0
 12314  12315  12316  238 -12318 0
 12314  12315  12316  238  12319 0

c  -1-1 --> -2
c    ( b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧  b^{14, 17}_0 ∧ -p_238) -> ( b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0)
c  in CNF:
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨  b^{14, 18}_2
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨  b^{14, 18}_1
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨  p_238 ∨ -b^{14, 18}_0
c  in DIMACS:
-12314  12315 -12316  238  12317 0
-12314  12315 -12316  238  12318 0
-12314  12315 -12316  238 -12319 0

c  -2-1 --> break 
c    ( b^{14, 17}_2 ∧  b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨  b^{14, 17}_0 ∨  p_238 ∨ break
c  in DIMACS:
-12314 -12315  12316  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 17}_2 ∧ -b^{14, 17}_1 ∧ -b^{14, 17}_0 ∧ true) 
c  in CNF:
c    -b^{14, 17}_2 ∨  b^{14, 17}_1 ∨  b^{14, 17}_0 ∨ false 
c  in DIMACS:
-12314  12315  12316  0

c  3 does not represent an automaton state.
c    -(-b^{14, 17}_2 ∧  b^{14, 17}_1 ∧  b^{14, 17}_0 ∧ true) 
c  in CNF:
c     b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ false 
c  in DIMACS:
 12314 -12315 -12316  0
c  -3 does not represent an automaton state.
c    -( b^{14, 17}_2 ∧  b^{14, 17}_1 ∧  b^{14, 17}_0 ∧ true) 
c  in CNF:
c    -b^{14, 17}_2 ∨ -b^{14, 17}_1 ∨ -b^{14, 17}_0 ∨ false 
c  in DIMACS:
-12314 -12315 -12316  0

c i = 18
c  -2+1 --> -1
c    ( b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧  p_252) -> ( b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0)
c  in CNF:
c    -b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨  b^{14, 19}_2
c    -b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_1
c    -b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨  b^{14, 19}_0
c  in DIMACS:
-12317 -12318  12319 -252  12320 0
-12317 -12318  12319 -252 -12321 0
-12317 -12318  12319 -252  12322 0

c  -1+1 --> 0
c    ( b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0 ∧  p_252) -> (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧ -b^{14, 19}_0)
c  in CNF:
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_2
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_1
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_0
c  in DIMACS:
-12317  12318 -12319 -252 -12320 0
-12317  12318 -12319 -252 -12321 0
-12317  12318 -12319 -252 -12322 0

c  0+1 --> 1
c    (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧  p_252) -> (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0)
c  in CNF:
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_2
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_1
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨  b^{14, 19}_0
c  in DIMACS:
 12317  12318  12319 -252 -12320 0
 12317  12318  12319 -252 -12321 0
 12317  12318  12319 -252  12322 0

c  1+1 --> 2
c    (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0 ∧  p_252) -> (-b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0)
c  in CNF:
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_2
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨  b^{14, 19}_1
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ -p_252 ∨ -b^{14, 19}_0
c  in DIMACS:
 12317  12318 -12319 -252 -12320 0
 12317  12318 -12319 -252  12321 0
 12317  12318 -12319 -252 -12322 0

c  2+1 --> break 
c    (-b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧  p_252) -> break
c  in CNF:
c     b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 12317 -12318  12319 -252 1162 0


c  2-1 --> 1
c    (-b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧ -p_252) -> (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0)
c  in CNF:
c     b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_2
c     b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_1
c     b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨  b^{14, 19}_0
c  in DIMACS:
 12317 -12318  12319  252 -12320 0
 12317 -12318  12319  252 -12321 0
 12317 -12318  12319  252  12322 0

c  1-1 --> 0
c    (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0 ∧ -p_252) -> (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧ -b^{14, 19}_0)
c  in CNF:
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_2
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_1
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_0
c  in DIMACS:
 12317  12318 -12319  252 -12320 0
 12317  12318 -12319  252 -12321 0
 12317  12318 -12319  252 -12322 0

c  0-1 --> -1
c    (-b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧ -p_252) -> ( b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0)
c  in CNF:
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨  b^{14, 19}_2
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_1
c     b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨  b^{14, 19}_0
c  in DIMACS:
 12317  12318  12319  252  12320 0
 12317  12318  12319  252 -12321 0
 12317  12318  12319  252  12322 0

c  -1-1 --> -2
c    ( b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧  b^{14, 18}_0 ∧ -p_252) -> ( b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0)
c  in CNF:
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨  b^{14, 19}_2
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨  b^{14, 19}_1
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨  p_252 ∨ -b^{14, 19}_0
c  in DIMACS:
-12317  12318 -12319  252  12320 0
-12317  12318 -12319  252  12321 0
-12317  12318 -12319  252 -12322 0

c  -2-1 --> break 
c    ( b^{14, 18}_2 ∧  b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨  b^{14, 18}_0 ∨  p_252 ∨ break
c  in DIMACS:
-12317 -12318  12319  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 18}_2 ∧ -b^{14, 18}_1 ∧ -b^{14, 18}_0 ∧ true) 
c  in CNF:
c    -b^{14, 18}_2 ∨  b^{14, 18}_1 ∨  b^{14, 18}_0 ∨ false 
c  in DIMACS:
-12317  12318  12319  0

c  3 does not represent an automaton state.
c    -(-b^{14, 18}_2 ∧  b^{14, 18}_1 ∧  b^{14, 18}_0 ∧ true) 
c  in CNF:
c     b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ false 
c  in DIMACS:
 12317 -12318 -12319  0
c  -3 does not represent an automaton state.
c    -( b^{14, 18}_2 ∧  b^{14, 18}_1 ∧  b^{14, 18}_0 ∧ true) 
c  in CNF:
c    -b^{14, 18}_2 ∨ -b^{14, 18}_1 ∨ -b^{14, 18}_0 ∨ false 
c  in DIMACS:
-12317 -12318 -12319  0

c i = 19
c  -2+1 --> -1
c    ( b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧  p_266) -> ( b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0)
c  in CNF:
c    -b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨  b^{14, 20}_2
c    -b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_1
c    -b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨  b^{14, 20}_0
c  in DIMACS:
-12320 -12321  12322 -266  12323 0
-12320 -12321  12322 -266 -12324 0
-12320 -12321  12322 -266  12325 0

c  -1+1 --> 0
c    ( b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0 ∧  p_266) -> (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧ -b^{14, 20}_0)
c  in CNF:
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_2
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_1
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_0
c  in DIMACS:
-12320  12321 -12322 -266 -12323 0
-12320  12321 -12322 -266 -12324 0
-12320  12321 -12322 -266 -12325 0

c  0+1 --> 1
c    (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧  p_266) -> (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0)
c  in CNF:
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_2
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_1
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨  b^{14, 20}_0
c  in DIMACS:
 12320  12321  12322 -266 -12323 0
 12320  12321  12322 -266 -12324 0
 12320  12321  12322 -266  12325 0

c  1+1 --> 2
c    (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0 ∧  p_266) -> (-b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0)
c  in CNF:
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_2
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨  b^{14, 20}_1
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ -p_266 ∨ -b^{14, 20}_0
c  in DIMACS:
 12320  12321 -12322 -266 -12323 0
 12320  12321 -12322 -266  12324 0
 12320  12321 -12322 -266 -12325 0

c  2+1 --> break 
c    (-b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧  p_266) -> break
c  in CNF:
c     b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 12320 -12321  12322 -266 1162 0


c  2-1 --> 1
c    (-b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧ -p_266) -> (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0)
c  in CNF:
c     b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_2
c     b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_1
c     b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨  b^{14, 20}_0
c  in DIMACS:
 12320 -12321  12322  266 -12323 0
 12320 -12321  12322  266 -12324 0
 12320 -12321  12322  266  12325 0

c  1-1 --> 0
c    (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0 ∧ -p_266) -> (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧ -b^{14, 20}_0)
c  in CNF:
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_2
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_1
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_0
c  in DIMACS:
 12320  12321 -12322  266 -12323 0
 12320  12321 -12322  266 -12324 0
 12320  12321 -12322  266 -12325 0

c  0-1 --> -1
c    (-b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧ -p_266) -> ( b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0)
c  in CNF:
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨  b^{14, 20}_2
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_1
c     b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨  b^{14, 20}_0
c  in DIMACS:
 12320  12321  12322  266  12323 0
 12320  12321  12322  266 -12324 0
 12320  12321  12322  266  12325 0

c  -1-1 --> -2
c    ( b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧  b^{14, 19}_0 ∧ -p_266) -> ( b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0)
c  in CNF:
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨  b^{14, 20}_2
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨  b^{14, 20}_1
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨  p_266 ∨ -b^{14, 20}_0
c  in DIMACS:
-12320  12321 -12322  266  12323 0
-12320  12321 -12322  266  12324 0
-12320  12321 -12322  266 -12325 0

c  -2-1 --> break 
c    ( b^{14, 19}_2 ∧  b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨  b^{14, 19}_0 ∨  p_266 ∨ break
c  in DIMACS:
-12320 -12321  12322  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 19}_2 ∧ -b^{14, 19}_1 ∧ -b^{14, 19}_0 ∧ true) 
c  in CNF:
c    -b^{14, 19}_2 ∨  b^{14, 19}_1 ∨  b^{14, 19}_0 ∨ false 
c  in DIMACS:
-12320  12321  12322  0

c  3 does not represent an automaton state.
c    -(-b^{14, 19}_2 ∧  b^{14, 19}_1 ∧  b^{14, 19}_0 ∧ true) 
c  in CNF:
c     b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ false 
c  in DIMACS:
 12320 -12321 -12322  0
c  -3 does not represent an automaton state.
c    -( b^{14, 19}_2 ∧  b^{14, 19}_1 ∧  b^{14, 19}_0 ∧ true) 
c  in CNF:
c    -b^{14, 19}_2 ∨ -b^{14, 19}_1 ∨ -b^{14, 19}_0 ∨ false 
c  in DIMACS:
-12320 -12321 -12322  0

c i = 20
c  -2+1 --> -1
c    ( b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧  p_280) -> ( b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0)
c  in CNF:
c    -b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨  b^{14, 21}_2
c    -b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_1
c    -b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨  b^{14, 21}_0
c  in DIMACS:
-12323 -12324  12325 -280  12326 0
-12323 -12324  12325 -280 -12327 0
-12323 -12324  12325 -280  12328 0

c  -1+1 --> 0
c    ( b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0 ∧  p_280) -> (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧ -b^{14, 21}_0)
c  in CNF:
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_2
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_1
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_0
c  in DIMACS:
-12323  12324 -12325 -280 -12326 0
-12323  12324 -12325 -280 -12327 0
-12323  12324 -12325 -280 -12328 0

c  0+1 --> 1
c    (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧  p_280) -> (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0)
c  in CNF:
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_2
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_1
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨  b^{14, 21}_0
c  in DIMACS:
 12323  12324  12325 -280 -12326 0
 12323  12324  12325 -280 -12327 0
 12323  12324  12325 -280  12328 0

c  1+1 --> 2
c    (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0 ∧  p_280) -> (-b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0)
c  in CNF:
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_2
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨  b^{14, 21}_1
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ -p_280 ∨ -b^{14, 21}_0
c  in DIMACS:
 12323  12324 -12325 -280 -12326 0
 12323  12324 -12325 -280  12327 0
 12323  12324 -12325 -280 -12328 0

c  2+1 --> break 
c    (-b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧  p_280) -> break
c  in CNF:
c     b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 12323 -12324  12325 -280 1162 0


c  2-1 --> 1
c    (-b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧ -p_280) -> (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0)
c  in CNF:
c     b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_2
c     b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_1
c     b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨  b^{14, 21}_0
c  in DIMACS:
 12323 -12324  12325  280 -12326 0
 12323 -12324  12325  280 -12327 0
 12323 -12324  12325  280  12328 0

c  1-1 --> 0
c    (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0 ∧ -p_280) -> (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧ -b^{14, 21}_0)
c  in CNF:
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_2
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_1
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_0
c  in DIMACS:
 12323  12324 -12325  280 -12326 0
 12323  12324 -12325  280 -12327 0
 12323  12324 -12325  280 -12328 0

c  0-1 --> -1
c    (-b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧ -p_280) -> ( b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0)
c  in CNF:
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨  b^{14, 21}_2
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_1
c     b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨  b^{14, 21}_0
c  in DIMACS:
 12323  12324  12325  280  12326 0
 12323  12324  12325  280 -12327 0
 12323  12324  12325  280  12328 0

c  -1-1 --> -2
c    ( b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧  b^{14, 20}_0 ∧ -p_280) -> ( b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0)
c  in CNF:
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨  b^{14, 21}_2
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨  b^{14, 21}_1
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨  p_280 ∨ -b^{14, 21}_0
c  in DIMACS:
-12323  12324 -12325  280  12326 0
-12323  12324 -12325  280  12327 0
-12323  12324 -12325  280 -12328 0

c  -2-1 --> break 
c    ( b^{14, 20}_2 ∧  b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨  b^{14, 20}_0 ∨  p_280 ∨ break
c  in DIMACS:
-12323 -12324  12325  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 20}_2 ∧ -b^{14, 20}_1 ∧ -b^{14, 20}_0 ∧ true) 
c  in CNF:
c    -b^{14, 20}_2 ∨  b^{14, 20}_1 ∨  b^{14, 20}_0 ∨ false 
c  in DIMACS:
-12323  12324  12325  0

c  3 does not represent an automaton state.
c    -(-b^{14, 20}_2 ∧  b^{14, 20}_1 ∧  b^{14, 20}_0 ∧ true) 
c  in CNF:
c     b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ false 
c  in DIMACS:
 12323 -12324 -12325  0
c  -3 does not represent an automaton state.
c    -( b^{14, 20}_2 ∧  b^{14, 20}_1 ∧  b^{14, 20}_0 ∧ true) 
c  in CNF:
c    -b^{14, 20}_2 ∨ -b^{14, 20}_1 ∨ -b^{14, 20}_0 ∨ false 
c  in DIMACS:
-12323 -12324 -12325  0

c i = 21
c  -2+1 --> -1
c    ( b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧  p_294) -> ( b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0)
c  in CNF:
c    -b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨  b^{14, 22}_2
c    -b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_1
c    -b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨  b^{14, 22}_0
c  in DIMACS:
-12326 -12327  12328 -294  12329 0
-12326 -12327  12328 -294 -12330 0
-12326 -12327  12328 -294  12331 0

c  -1+1 --> 0
c    ( b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0 ∧  p_294) -> (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧ -b^{14, 22}_0)
c  in CNF:
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_2
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_1
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_0
c  in DIMACS:
-12326  12327 -12328 -294 -12329 0
-12326  12327 -12328 -294 -12330 0
-12326  12327 -12328 -294 -12331 0

c  0+1 --> 1
c    (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧  p_294) -> (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0)
c  in CNF:
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_2
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_1
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨  b^{14, 22}_0
c  in DIMACS:
 12326  12327  12328 -294 -12329 0
 12326  12327  12328 -294 -12330 0
 12326  12327  12328 -294  12331 0

c  1+1 --> 2
c    (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0 ∧  p_294) -> (-b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0)
c  in CNF:
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_2
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨  b^{14, 22}_1
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ -p_294 ∨ -b^{14, 22}_0
c  in DIMACS:
 12326  12327 -12328 -294 -12329 0
 12326  12327 -12328 -294  12330 0
 12326  12327 -12328 -294 -12331 0

c  2+1 --> break 
c    (-b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧  p_294) -> break
c  in CNF:
c     b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 12326 -12327  12328 -294 1162 0


c  2-1 --> 1
c    (-b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧ -p_294) -> (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0)
c  in CNF:
c     b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_2
c     b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_1
c     b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨  b^{14, 22}_0
c  in DIMACS:
 12326 -12327  12328  294 -12329 0
 12326 -12327  12328  294 -12330 0
 12326 -12327  12328  294  12331 0

c  1-1 --> 0
c    (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0 ∧ -p_294) -> (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧ -b^{14, 22}_0)
c  in CNF:
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_2
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_1
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_0
c  in DIMACS:
 12326  12327 -12328  294 -12329 0
 12326  12327 -12328  294 -12330 0
 12326  12327 -12328  294 -12331 0

c  0-1 --> -1
c    (-b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧ -p_294) -> ( b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0)
c  in CNF:
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨  b^{14, 22}_2
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_1
c     b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨  b^{14, 22}_0
c  in DIMACS:
 12326  12327  12328  294  12329 0
 12326  12327  12328  294 -12330 0
 12326  12327  12328  294  12331 0

c  -1-1 --> -2
c    ( b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧  b^{14, 21}_0 ∧ -p_294) -> ( b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0)
c  in CNF:
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨  b^{14, 22}_2
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨  b^{14, 22}_1
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨  p_294 ∨ -b^{14, 22}_0
c  in DIMACS:
-12326  12327 -12328  294  12329 0
-12326  12327 -12328  294  12330 0
-12326  12327 -12328  294 -12331 0

c  -2-1 --> break 
c    ( b^{14, 21}_2 ∧  b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨  b^{14, 21}_0 ∨  p_294 ∨ break
c  in DIMACS:
-12326 -12327  12328  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 21}_2 ∧ -b^{14, 21}_1 ∧ -b^{14, 21}_0 ∧ true) 
c  in CNF:
c    -b^{14, 21}_2 ∨  b^{14, 21}_1 ∨  b^{14, 21}_0 ∨ false 
c  in DIMACS:
-12326  12327  12328  0

c  3 does not represent an automaton state.
c    -(-b^{14, 21}_2 ∧  b^{14, 21}_1 ∧  b^{14, 21}_0 ∧ true) 
c  in CNF:
c     b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ false 
c  in DIMACS:
 12326 -12327 -12328  0
c  -3 does not represent an automaton state.
c    -( b^{14, 21}_2 ∧  b^{14, 21}_1 ∧  b^{14, 21}_0 ∧ true) 
c  in CNF:
c    -b^{14, 21}_2 ∨ -b^{14, 21}_1 ∨ -b^{14, 21}_0 ∨ false 
c  in DIMACS:
-12326 -12327 -12328  0

c i = 22
c  -2+1 --> -1
c    ( b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧  p_308) -> ( b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0)
c  in CNF:
c    -b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨  b^{14, 23}_2
c    -b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_1
c    -b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨  b^{14, 23}_0
c  in DIMACS:
-12329 -12330  12331 -308  12332 0
-12329 -12330  12331 -308 -12333 0
-12329 -12330  12331 -308  12334 0

c  -1+1 --> 0
c    ( b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0 ∧  p_308) -> (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧ -b^{14, 23}_0)
c  in CNF:
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_2
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_1
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_0
c  in DIMACS:
-12329  12330 -12331 -308 -12332 0
-12329  12330 -12331 -308 -12333 0
-12329  12330 -12331 -308 -12334 0

c  0+1 --> 1
c    (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧  p_308) -> (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0)
c  in CNF:
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_2
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_1
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨  b^{14, 23}_0
c  in DIMACS:
 12329  12330  12331 -308 -12332 0
 12329  12330  12331 -308 -12333 0
 12329  12330  12331 -308  12334 0

c  1+1 --> 2
c    (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0 ∧  p_308) -> (-b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0)
c  in CNF:
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_2
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨  b^{14, 23}_1
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ -p_308 ∨ -b^{14, 23}_0
c  in DIMACS:
 12329  12330 -12331 -308 -12332 0
 12329  12330 -12331 -308  12333 0
 12329  12330 -12331 -308 -12334 0

c  2+1 --> break 
c    (-b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧  p_308) -> break
c  in CNF:
c     b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 12329 -12330  12331 -308 1162 0


c  2-1 --> 1
c    (-b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧ -p_308) -> (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0)
c  in CNF:
c     b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_2
c     b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_1
c     b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨  b^{14, 23}_0
c  in DIMACS:
 12329 -12330  12331  308 -12332 0
 12329 -12330  12331  308 -12333 0
 12329 -12330  12331  308  12334 0

c  1-1 --> 0
c    (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0 ∧ -p_308) -> (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧ -b^{14, 23}_0)
c  in CNF:
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_2
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_1
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_0
c  in DIMACS:
 12329  12330 -12331  308 -12332 0
 12329  12330 -12331  308 -12333 0
 12329  12330 -12331  308 -12334 0

c  0-1 --> -1
c    (-b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧ -p_308) -> ( b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0)
c  in CNF:
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨  b^{14, 23}_2
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_1
c     b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨  b^{14, 23}_0
c  in DIMACS:
 12329  12330  12331  308  12332 0
 12329  12330  12331  308 -12333 0
 12329  12330  12331  308  12334 0

c  -1-1 --> -2
c    ( b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧  b^{14, 22}_0 ∧ -p_308) -> ( b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0)
c  in CNF:
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨  b^{14, 23}_2
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨  b^{14, 23}_1
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨  p_308 ∨ -b^{14, 23}_0
c  in DIMACS:
-12329  12330 -12331  308  12332 0
-12329  12330 -12331  308  12333 0
-12329  12330 -12331  308 -12334 0

c  -2-1 --> break 
c    ( b^{14, 22}_2 ∧  b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨  b^{14, 22}_0 ∨  p_308 ∨ break
c  in DIMACS:
-12329 -12330  12331  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 22}_2 ∧ -b^{14, 22}_1 ∧ -b^{14, 22}_0 ∧ true) 
c  in CNF:
c    -b^{14, 22}_2 ∨  b^{14, 22}_1 ∨  b^{14, 22}_0 ∨ false 
c  in DIMACS:
-12329  12330  12331  0

c  3 does not represent an automaton state.
c    -(-b^{14, 22}_2 ∧  b^{14, 22}_1 ∧  b^{14, 22}_0 ∧ true) 
c  in CNF:
c     b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ false 
c  in DIMACS:
 12329 -12330 -12331  0
c  -3 does not represent an automaton state.
c    -( b^{14, 22}_2 ∧  b^{14, 22}_1 ∧  b^{14, 22}_0 ∧ true) 
c  in CNF:
c    -b^{14, 22}_2 ∨ -b^{14, 22}_1 ∨ -b^{14, 22}_0 ∨ false 
c  in DIMACS:
-12329 -12330 -12331  0

c i = 23
c  -2+1 --> -1
c    ( b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧  p_322) -> ( b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0)
c  in CNF:
c    -b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨  b^{14, 24}_2
c    -b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_1
c    -b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨  b^{14, 24}_0
c  in DIMACS:
-12332 -12333  12334 -322  12335 0
-12332 -12333  12334 -322 -12336 0
-12332 -12333  12334 -322  12337 0

c  -1+1 --> 0
c    ( b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0 ∧  p_322) -> (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧ -b^{14, 24}_0)
c  in CNF:
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_2
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_1
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_0
c  in DIMACS:
-12332  12333 -12334 -322 -12335 0
-12332  12333 -12334 -322 -12336 0
-12332  12333 -12334 -322 -12337 0

c  0+1 --> 1
c    (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧  p_322) -> (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0)
c  in CNF:
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_2
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_1
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨  b^{14, 24}_0
c  in DIMACS:
 12332  12333  12334 -322 -12335 0
 12332  12333  12334 -322 -12336 0
 12332  12333  12334 -322  12337 0

c  1+1 --> 2
c    (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0 ∧  p_322) -> (-b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0)
c  in CNF:
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_2
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨  b^{14, 24}_1
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ -p_322 ∨ -b^{14, 24}_0
c  in DIMACS:
 12332  12333 -12334 -322 -12335 0
 12332  12333 -12334 -322  12336 0
 12332  12333 -12334 -322 -12337 0

c  2+1 --> break 
c    (-b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧  p_322) -> break
c  in CNF:
c     b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 12332 -12333  12334 -322 1162 0


c  2-1 --> 1
c    (-b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧ -p_322) -> (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0)
c  in CNF:
c     b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_2
c     b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_1
c     b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨  b^{14, 24}_0
c  in DIMACS:
 12332 -12333  12334  322 -12335 0
 12332 -12333  12334  322 -12336 0
 12332 -12333  12334  322  12337 0

c  1-1 --> 0
c    (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0 ∧ -p_322) -> (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧ -b^{14, 24}_0)
c  in CNF:
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_2
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_1
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_0
c  in DIMACS:
 12332  12333 -12334  322 -12335 0
 12332  12333 -12334  322 -12336 0
 12332  12333 -12334  322 -12337 0

c  0-1 --> -1
c    (-b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧ -p_322) -> ( b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0)
c  in CNF:
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨  b^{14, 24}_2
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_1
c     b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨  b^{14, 24}_0
c  in DIMACS:
 12332  12333  12334  322  12335 0
 12332  12333  12334  322 -12336 0
 12332  12333  12334  322  12337 0

c  -1-1 --> -2
c    ( b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧  b^{14, 23}_0 ∧ -p_322) -> ( b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0)
c  in CNF:
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨  b^{14, 24}_2
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨  b^{14, 24}_1
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨  p_322 ∨ -b^{14, 24}_0
c  in DIMACS:
-12332  12333 -12334  322  12335 0
-12332  12333 -12334  322  12336 0
-12332  12333 -12334  322 -12337 0

c  -2-1 --> break 
c    ( b^{14, 23}_2 ∧  b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨  b^{14, 23}_0 ∨  p_322 ∨ break
c  in DIMACS:
-12332 -12333  12334  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 23}_2 ∧ -b^{14, 23}_1 ∧ -b^{14, 23}_0 ∧ true) 
c  in CNF:
c    -b^{14, 23}_2 ∨  b^{14, 23}_1 ∨  b^{14, 23}_0 ∨ false 
c  in DIMACS:
-12332  12333  12334  0

c  3 does not represent an automaton state.
c    -(-b^{14, 23}_2 ∧  b^{14, 23}_1 ∧  b^{14, 23}_0 ∧ true) 
c  in CNF:
c     b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ false 
c  in DIMACS:
 12332 -12333 -12334  0
c  -3 does not represent an automaton state.
c    -( b^{14, 23}_2 ∧  b^{14, 23}_1 ∧  b^{14, 23}_0 ∧ true) 
c  in CNF:
c    -b^{14, 23}_2 ∨ -b^{14, 23}_1 ∨ -b^{14, 23}_0 ∨ false 
c  in DIMACS:
-12332 -12333 -12334  0

c i = 24
c  -2+1 --> -1
c    ( b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧  p_336) -> ( b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0)
c  in CNF:
c    -b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨  b^{14, 25}_2
c    -b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_1
c    -b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨  b^{14, 25}_0
c  in DIMACS:
-12335 -12336  12337 -336  12338 0
-12335 -12336  12337 -336 -12339 0
-12335 -12336  12337 -336  12340 0

c  -1+1 --> 0
c    ( b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0 ∧  p_336) -> (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧ -b^{14, 25}_0)
c  in CNF:
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_2
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_1
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_0
c  in DIMACS:
-12335  12336 -12337 -336 -12338 0
-12335  12336 -12337 -336 -12339 0
-12335  12336 -12337 -336 -12340 0

c  0+1 --> 1
c    (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧  p_336) -> (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0)
c  in CNF:
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_2
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_1
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨  b^{14, 25}_0
c  in DIMACS:
 12335  12336  12337 -336 -12338 0
 12335  12336  12337 -336 -12339 0
 12335  12336  12337 -336  12340 0

c  1+1 --> 2
c    (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0 ∧  p_336) -> (-b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0)
c  in CNF:
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_2
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨  b^{14, 25}_1
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ -p_336 ∨ -b^{14, 25}_0
c  in DIMACS:
 12335  12336 -12337 -336 -12338 0
 12335  12336 -12337 -336  12339 0
 12335  12336 -12337 -336 -12340 0

c  2+1 --> break 
c    (-b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧  p_336) -> break
c  in CNF:
c     b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 12335 -12336  12337 -336 1162 0


c  2-1 --> 1
c    (-b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧ -p_336) -> (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0)
c  in CNF:
c     b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_2
c     b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_1
c     b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨  b^{14, 25}_0
c  in DIMACS:
 12335 -12336  12337  336 -12338 0
 12335 -12336  12337  336 -12339 0
 12335 -12336  12337  336  12340 0

c  1-1 --> 0
c    (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0 ∧ -p_336) -> (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧ -b^{14, 25}_0)
c  in CNF:
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_2
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_1
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_0
c  in DIMACS:
 12335  12336 -12337  336 -12338 0
 12335  12336 -12337  336 -12339 0
 12335  12336 -12337  336 -12340 0

c  0-1 --> -1
c    (-b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧ -p_336) -> ( b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0)
c  in CNF:
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨  b^{14, 25}_2
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_1
c     b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨  b^{14, 25}_0
c  in DIMACS:
 12335  12336  12337  336  12338 0
 12335  12336  12337  336 -12339 0
 12335  12336  12337  336  12340 0

c  -1-1 --> -2
c    ( b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧  b^{14, 24}_0 ∧ -p_336) -> ( b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0)
c  in CNF:
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨  b^{14, 25}_2
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨  b^{14, 25}_1
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨  p_336 ∨ -b^{14, 25}_0
c  in DIMACS:
-12335  12336 -12337  336  12338 0
-12335  12336 -12337  336  12339 0
-12335  12336 -12337  336 -12340 0

c  -2-1 --> break 
c    ( b^{14, 24}_2 ∧  b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨  b^{14, 24}_0 ∨  p_336 ∨ break
c  in DIMACS:
-12335 -12336  12337  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 24}_2 ∧ -b^{14, 24}_1 ∧ -b^{14, 24}_0 ∧ true) 
c  in CNF:
c    -b^{14, 24}_2 ∨  b^{14, 24}_1 ∨  b^{14, 24}_0 ∨ false 
c  in DIMACS:
-12335  12336  12337  0

c  3 does not represent an automaton state.
c    -(-b^{14, 24}_2 ∧  b^{14, 24}_1 ∧  b^{14, 24}_0 ∧ true) 
c  in CNF:
c     b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ false 
c  in DIMACS:
 12335 -12336 -12337  0
c  -3 does not represent an automaton state.
c    -( b^{14, 24}_2 ∧  b^{14, 24}_1 ∧  b^{14, 24}_0 ∧ true) 
c  in CNF:
c    -b^{14, 24}_2 ∨ -b^{14, 24}_1 ∨ -b^{14, 24}_0 ∨ false 
c  in DIMACS:
-12335 -12336 -12337  0

c i = 25
c  -2+1 --> -1
c    ( b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧  p_350) -> ( b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0)
c  in CNF:
c    -b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨  b^{14, 26}_2
c    -b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_1
c    -b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨  b^{14, 26}_0
c  in DIMACS:
-12338 -12339  12340 -350  12341 0
-12338 -12339  12340 -350 -12342 0
-12338 -12339  12340 -350  12343 0

c  -1+1 --> 0
c    ( b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0 ∧  p_350) -> (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧ -b^{14, 26}_0)
c  in CNF:
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_2
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_1
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_0
c  in DIMACS:
-12338  12339 -12340 -350 -12341 0
-12338  12339 -12340 -350 -12342 0
-12338  12339 -12340 -350 -12343 0

c  0+1 --> 1
c    (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧  p_350) -> (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0)
c  in CNF:
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_2
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_1
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨  b^{14, 26}_0
c  in DIMACS:
 12338  12339  12340 -350 -12341 0
 12338  12339  12340 -350 -12342 0
 12338  12339  12340 -350  12343 0

c  1+1 --> 2
c    (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0 ∧  p_350) -> (-b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0)
c  in CNF:
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_2
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨  b^{14, 26}_1
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ -p_350 ∨ -b^{14, 26}_0
c  in DIMACS:
 12338  12339 -12340 -350 -12341 0
 12338  12339 -12340 -350  12342 0
 12338  12339 -12340 -350 -12343 0

c  2+1 --> break 
c    (-b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧  p_350) -> break
c  in CNF:
c     b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 12338 -12339  12340 -350 1162 0


c  2-1 --> 1
c    (-b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧ -p_350) -> (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0)
c  in CNF:
c     b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_2
c     b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_1
c     b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨  b^{14, 26}_0
c  in DIMACS:
 12338 -12339  12340  350 -12341 0
 12338 -12339  12340  350 -12342 0
 12338 -12339  12340  350  12343 0

c  1-1 --> 0
c    (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0 ∧ -p_350) -> (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧ -b^{14, 26}_0)
c  in CNF:
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_2
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_1
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_0
c  in DIMACS:
 12338  12339 -12340  350 -12341 0
 12338  12339 -12340  350 -12342 0
 12338  12339 -12340  350 -12343 0

c  0-1 --> -1
c    (-b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧ -p_350) -> ( b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0)
c  in CNF:
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨  b^{14, 26}_2
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_1
c     b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨  b^{14, 26}_0
c  in DIMACS:
 12338  12339  12340  350  12341 0
 12338  12339  12340  350 -12342 0
 12338  12339  12340  350  12343 0

c  -1-1 --> -2
c    ( b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧  b^{14, 25}_0 ∧ -p_350) -> ( b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0)
c  in CNF:
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨  b^{14, 26}_2
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨  b^{14, 26}_1
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨  p_350 ∨ -b^{14, 26}_0
c  in DIMACS:
-12338  12339 -12340  350  12341 0
-12338  12339 -12340  350  12342 0
-12338  12339 -12340  350 -12343 0

c  -2-1 --> break 
c    ( b^{14, 25}_2 ∧  b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨  b^{14, 25}_0 ∨  p_350 ∨ break
c  in DIMACS:
-12338 -12339  12340  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 25}_2 ∧ -b^{14, 25}_1 ∧ -b^{14, 25}_0 ∧ true) 
c  in CNF:
c    -b^{14, 25}_2 ∨  b^{14, 25}_1 ∨  b^{14, 25}_0 ∨ false 
c  in DIMACS:
-12338  12339  12340  0

c  3 does not represent an automaton state.
c    -(-b^{14, 25}_2 ∧  b^{14, 25}_1 ∧  b^{14, 25}_0 ∧ true) 
c  in CNF:
c     b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ false 
c  in DIMACS:
 12338 -12339 -12340  0
c  -3 does not represent an automaton state.
c    -( b^{14, 25}_2 ∧  b^{14, 25}_1 ∧  b^{14, 25}_0 ∧ true) 
c  in CNF:
c    -b^{14, 25}_2 ∨ -b^{14, 25}_1 ∨ -b^{14, 25}_0 ∨ false 
c  in DIMACS:
-12338 -12339 -12340  0

c i = 26
c  -2+1 --> -1
c    ( b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧  p_364) -> ( b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0)
c  in CNF:
c    -b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨  b^{14, 27}_2
c    -b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_1
c    -b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨  b^{14, 27}_0
c  in DIMACS:
-12341 -12342  12343 -364  12344 0
-12341 -12342  12343 -364 -12345 0
-12341 -12342  12343 -364  12346 0

c  -1+1 --> 0
c    ( b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0 ∧  p_364) -> (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧ -b^{14, 27}_0)
c  in CNF:
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_2
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_1
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_0
c  in DIMACS:
-12341  12342 -12343 -364 -12344 0
-12341  12342 -12343 -364 -12345 0
-12341  12342 -12343 -364 -12346 0

c  0+1 --> 1
c    (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧  p_364) -> (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0)
c  in CNF:
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_2
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_1
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨  b^{14, 27}_0
c  in DIMACS:
 12341  12342  12343 -364 -12344 0
 12341  12342  12343 -364 -12345 0
 12341  12342  12343 -364  12346 0

c  1+1 --> 2
c    (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0 ∧  p_364) -> (-b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0)
c  in CNF:
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_2
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨  b^{14, 27}_1
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ -p_364 ∨ -b^{14, 27}_0
c  in DIMACS:
 12341  12342 -12343 -364 -12344 0
 12341  12342 -12343 -364  12345 0
 12341  12342 -12343 -364 -12346 0

c  2+1 --> break 
c    (-b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧  p_364) -> break
c  in CNF:
c     b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 12341 -12342  12343 -364 1162 0


c  2-1 --> 1
c    (-b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧ -p_364) -> (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0)
c  in CNF:
c     b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_2
c     b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_1
c     b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨  b^{14, 27}_0
c  in DIMACS:
 12341 -12342  12343  364 -12344 0
 12341 -12342  12343  364 -12345 0
 12341 -12342  12343  364  12346 0

c  1-1 --> 0
c    (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0 ∧ -p_364) -> (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧ -b^{14, 27}_0)
c  in CNF:
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_2
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_1
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_0
c  in DIMACS:
 12341  12342 -12343  364 -12344 0
 12341  12342 -12343  364 -12345 0
 12341  12342 -12343  364 -12346 0

c  0-1 --> -1
c    (-b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧ -p_364) -> ( b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0)
c  in CNF:
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨  b^{14, 27}_2
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_1
c     b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨  b^{14, 27}_0
c  in DIMACS:
 12341  12342  12343  364  12344 0
 12341  12342  12343  364 -12345 0
 12341  12342  12343  364  12346 0

c  -1-1 --> -2
c    ( b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧  b^{14, 26}_0 ∧ -p_364) -> ( b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0)
c  in CNF:
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨  b^{14, 27}_2
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨  b^{14, 27}_1
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨  p_364 ∨ -b^{14, 27}_0
c  in DIMACS:
-12341  12342 -12343  364  12344 0
-12341  12342 -12343  364  12345 0
-12341  12342 -12343  364 -12346 0

c  -2-1 --> break 
c    ( b^{14, 26}_2 ∧  b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨  b^{14, 26}_0 ∨  p_364 ∨ break
c  in DIMACS:
-12341 -12342  12343  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 26}_2 ∧ -b^{14, 26}_1 ∧ -b^{14, 26}_0 ∧ true) 
c  in CNF:
c    -b^{14, 26}_2 ∨  b^{14, 26}_1 ∨  b^{14, 26}_0 ∨ false 
c  in DIMACS:
-12341  12342  12343  0

c  3 does not represent an automaton state.
c    -(-b^{14, 26}_2 ∧  b^{14, 26}_1 ∧  b^{14, 26}_0 ∧ true) 
c  in CNF:
c     b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ false 
c  in DIMACS:
 12341 -12342 -12343  0
c  -3 does not represent an automaton state.
c    -( b^{14, 26}_2 ∧  b^{14, 26}_1 ∧  b^{14, 26}_0 ∧ true) 
c  in CNF:
c    -b^{14, 26}_2 ∨ -b^{14, 26}_1 ∨ -b^{14, 26}_0 ∨ false 
c  in DIMACS:
-12341 -12342 -12343  0

c i = 27
c  -2+1 --> -1
c    ( b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧  p_378) -> ( b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0)
c  in CNF:
c    -b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨  b^{14, 28}_2
c    -b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_1
c    -b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨  b^{14, 28}_0
c  in DIMACS:
-12344 -12345  12346 -378  12347 0
-12344 -12345  12346 -378 -12348 0
-12344 -12345  12346 -378  12349 0

c  -1+1 --> 0
c    ( b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0 ∧  p_378) -> (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧ -b^{14, 28}_0)
c  in CNF:
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_2
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_1
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_0
c  in DIMACS:
-12344  12345 -12346 -378 -12347 0
-12344  12345 -12346 -378 -12348 0
-12344  12345 -12346 -378 -12349 0

c  0+1 --> 1
c    (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧  p_378) -> (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0)
c  in CNF:
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_2
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_1
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨  b^{14, 28}_0
c  in DIMACS:
 12344  12345  12346 -378 -12347 0
 12344  12345  12346 -378 -12348 0
 12344  12345  12346 -378  12349 0

c  1+1 --> 2
c    (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0 ∧  p_378) -> (-b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0)
c  in CNF:
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_2
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨  b^{14, 28}_1
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ -p_378 ∨ -b^{14, 28}_0
c  in DIMACS:
 12344  12345 -12346 -378 -12347 0
 12344  12345 -12346 -378  12348 0
 12344  12345 -12346 -378 -12349 0

c  2+1 --> break 
c    (-b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧  p_378) -> break
c  in CNF:
c     b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 12344 -12345  12346 -378 1162 0


c  2-1 --> 1
c    (-b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧ -p_378) -> (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0)
c  in CNF:
c     b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_2
c     b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_1
c     b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨  b^{14, 28}_0
c  in DIMACS:
 12344 -12345  12346  378 -12347 0
 12344 -12345  12346  378 -12348 0
 12344 -12345  12346  378  12349 0

c  1-1 --> 0
c    (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0 ∧ -p_378) -> (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧ -b^{14, 28}_0)
c  in CNF:
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_2
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_1
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_0
c  in DIMACS:
 12344  12345 -12346  378 -12347 0
 12344  12345 -12346  378 -12348 0
 12344  12345 -12346  378 -12349 0

c  0-1 --> -1
c    (-b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧ -p_378) -> ( b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0)
c  in CNF:
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨  b^{14, 28}_2
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_1
c     b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨  b^{14, 28}_0
c  in DIMACS:
 12344  12345  12346  378  12347 0
 12344  12345  12346  378 -12348 0
 12344  12345  12346  378  12349 0

c  -1-1 --> -2
c    ( b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧  b^{14, 27}_0 ∧ -p_378) -> ( b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0)
c  in CNF:
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨  b^{14, 28}_2
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨  b^{14, 28}_1
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨  p_378 ∨ -b^{14, 28}_0
c  in DIMACS:
-12344  12345 -12346  378  12347 0
-12344  12345 -12346  378  12348 0
-12344  12345 -12346  378 -12349 0

c  -2-1 --> break 
c    ( b^{14, 27}_2 ∧  b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨  b^{14, 27}_0 ∨  p_378 ∨ break
c  in DIMACS:
-12344 -12345  12346  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 27}_2 ∧ -b^{14, 27}_1 ∧ -b^{14, 27}_0 ∧ true) 
c  in CNF:
c    -b^{14, 27}_2 ∨  b^{14, 27}_1 ∨  b^{14, 27}_0 ∨ false 
c  in DIMACS:
-12344  12345  12346  0

c  3 does not represent an automaton state.
c    -(-b^{14, 27}_2 ∧  b^{14, 27}_1 ∧  b^{14, 27}_0 ∧ true) 
c  in CNF:
c     b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ false 
c  in DIMACS:
 12344 -12345 -12346  0
c  -3 does not represent an automaton state.
c    -( b^{14, 27}_2 ∧  b^{14, 27}_1 ∧  b^{14, 27}_0 ∧ true) 
c  in CNF:
c    -b^{14, 27}_2 ∨ -b^{14, 27}_1 ∨ -b^{14, 27}_0 ∨ false 
c  in DIMACS:
-12344 -12345 -12346  0

c i = 28
c  -2+1 --> -1
c    ( b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧  p_392) -> ( b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0)
c  in CNF:
c    -b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨  b^{14, 29}_2
c    -b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_1
c    -b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨  b^{14, 29}_0
c  in DIMACS:
-12347 -12348  12349 -392  12350 0
-12347 -12348  12349 -392 -12351 0
-12347 -12348  12349 -392  12352 0

c  -1+1 --> 0
c    ( b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0 ∧  p_392) -> (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧ -b^{14, 29}_0)
c  in CNF:
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_2
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_1
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_0
c  in DIMACS:
-12347  12348 -12349 -392 -12350 0
-12347  12348 -12349 -392 -12351 0
-12347  12348 -12349 -392 -12352 0

c  0+1 --> 1
c    (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧  p_392) -> (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0)
c  in CNF:
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_2
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_1
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨  b^{14, 29}_0
c  in DIMACS:
 12347  12348  12349 -392 -12350 0
 12347  12348  12349 -392 -12351 0
 12347  12348  12349 -392  12352 0

c  1+1 --> 2
c    (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0 ∧  p_392) -> (-b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0)
c  in CNF:
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_2
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨  b^{14, 29}_1
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ -p_392 ∨ -b^{14, 29}_0
c  in DIMACS:
 12347  12348 -12349 -392 -12350 0
 12347  12348 -12349 -392  12351 0
 12347  12348 -12349 -392 -12352 0

c  2+1 --> break 
c    (-b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧  p_392) -> break
c  in CNF:
c     b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 12347 -12348  12349 -392 1162 0


c  2-1 --> 1
c    (-b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧ -p_392) -> (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0)
c  in CNF:
c     b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_2
c     b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_1
c     b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨  b^{14, 29}_0
c  in DIMACS:
 12347 -12348  12349  392 -12350 0
 12347 -12348  12349  392 -12351 0
 12347 -12348  12349  392  12352 0

c  1-1 --> 0
c    (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0 ∧ -p_392) -> (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧ -b^{14, 29}_0)
c  in CNF:
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_2
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_1
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_0
c  in DIMACS:
 12347  12348 -12349  392 -12350 0
 12347  12348 -12349  392 -12351 0
 12347  12348 -12349  392 -12352 0

c  0-1 --> -1
c    (-b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧ -p_392) -> ( b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0)
c  in CNF:
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨  b^{14, 29}_2
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_1
c     b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨  b^{14, 29}_0
c  in DIMACS:
 12347  12348  12349  392  12350 0
 12347  12348  12349  392 -12351 0
 12347  12348  12349  392  12352 0

c  -1-1 --> -2
c    ( b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧  b^{14, 28}_0 ∧ -p_392) -> ( b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0)
c  in CNF:
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨  b^{14, 29}_2
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨  b^{14, 29}_1
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨  p_392 ∨ -b^{14, 29}_0
c  in DIMACS:
-12347  12348 -12349  392  12350 0
-12347  12348 -12349  392  12351 0
-12347  12348 -12349  392 -12352 0

c  -2-1 --> break 
c    ( b^{14, 28}_2 ∧  b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨  b^{14, 28}_0 ∨  p_392 ∨ break
c  in DIMACS:
-12347 -12348  12349  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 28}_2 ∧ -b^{14, 28}_1 ∧ -b^{14, 28}_0 ∧ true) 
c  in CNF:
c    -b^{14, 28}_2 ∨  b^{14, 28}_1 ∨  b^{14, 28}_0 ∨ false 
c  in DIMACS:
-12347  12348  12349  0

c  3 does not represent an automaton state.
c    -(-b^{14, 28}_2 ∧  b^{14, 28}_1 ∧  b^{14, 28}_0 ∧ true) 
c  in CNF:
c     b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ false 
c  in DIMACS:
 12347 -12348 -12349  0
c  -3 does not represent an automaton state.
c    -( b^{14, 28}_2 ∧  b^{14, 28}_1 ∧  b^{14, 28}_0 ∧ true) 
c  in CNF:
c    -b^{14, 28}_2 ∨ -b^{14, 28}_1 ∨ -b^{14, 28}_0 ∨ false 
c  in DIMACS:
-12347 -12348 -12349  0

c i = 29
c  -2+1 --> -1
c    ( b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧  p_406) -> ( b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0)
c  in CNF:
c    -b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨  b^{14, 30}_2
c    -b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_1
c    -b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨  b^{14, 30}_0
c  in DIMACS:
-12350 -12351  12352 -406  12353 0
-12350 -12351  12352 -406 -12354 0
-12350 -12351  12352 -406  12355 0

c  -1+1 --> 0
c    ( b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0 ∧  p_406) -> (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧ -b^{14, 30}_0)
c  in CNF:
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_2
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_1
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_0
c  in DIMACS:
-12350  12351 -12352 -406 -12353 0
-12350  12351 -12352 -406 -12354 0
-12350  12351 -12352 -406 -12355 0

c  0+1 --> 1
c    (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧  p_406) -> (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0)
c  in CNF:
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_2
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_1
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨  b^{14, 30}_0
c  in DIMACS:
 12350  12351  12352 -406 -12353 0
 12350  12351  12352 -406 -12354 0
 12350  12351  12352 -406  12355 0

c  1+1 --> 2
c    (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0 ∧  p_406) -> (-b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0)
c  in CNF:
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_2
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨  b^{14, 30}_1
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ -p_406 ∨ -b^{14, 30}_0
c  in DIMACS:
 12350  12351 -12352 -406 -12353 0
 12350  12351 -12352 -406  12354 0
 12350  12351 -12352 -406 -12355 0

c  2+1 --> break 
c    (-b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧  p_406) -> break
c  in CNF:
c     b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 12350 -12351  12352 -406 1162 0


c  2-1 --> 1
c    (-b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧ -p_406) -> (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0)
c  in CNF:
c     b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_2
c     b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_1
c     b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨  b^{14, 30}_0
c  in DIMACS:
 12350 -12351  12352  406 -12353 0
 12350 -12351  12352  406 -12354 0
 12350 -12351  12352  406  12355 0

c  1-1 --> 0
c    (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0 ∧ -p_406) -> (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧ -b^{14, 30}_0)
c  in CNF:
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_2
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_1
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_0
c  in DIMACS:
 12350  12351 -12352  406 -12353 0
 12350  12351 -12352  406 -12354 0
 12350  12351 -12352  406 -12355 0

c  0-1 --> -1
c    (-b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧ -p_406) -> ( b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0)
c  in CNF:
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨  b^{14, 30}_2
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_1
c     b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨  b^{14, 30}_0
c  in DIMACS:
 12350  12351  12352  406  12353 0
 12350  12351  12352  406 -12354 0
 12350  12351  12352  406  12355 0

c  -1-1 --> -2
c    ( b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧  b^{14, 29}_0 ∧ -p_406) -> ( b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0)
c  in CNF:
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨  b^{14, 30}_2
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨  b^{14, 30}_1
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨  p_406 ∨ -b^{14, 30}_0
c  in DIMACS:
-12350  12351 -12352  406  12353 0
-12350  12351 -12352  406  12354 0
-12350  12351 -12352  406 -12355 0

c  -2-1 --> break 
c    ( b^{14, 29}_2 ∧  b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨  b^{14, 29}_0 ∨  p_406 ∨ break
c  in DIMACS:
-12350 -12351  12352  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 29}_2 ∧ -b^{14, 29}_1 ∧ -b^{14, 29}_0 ∧ true) 
c  in CNF:
c    -b^{14, 29}_2 ∨  b^{14, 29}_1 ∨  b^{14, 29}_0 ∨ false 
c  in DIMACS:
-12350  12351  12352  0

c  3 does not represent an automaton state.
c    -(-b^{14, 29}_2 ∧  b^{14, 29}_1 ∧  b^{14, 29}_0 ∧ true) 
c  in CNF:
c     b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ false 
c  in DIMACS:
 12350 -12351 -12352  0
c  -3 does not represent an automaton state.
c    -( b^{14, 29}_2 ∧  b^{14, 29}_1 ∧  b^{14, 29}_0 ∧ true) 
c  in CNF:
c    -b^{14, 29}_2 ∨ -b^{14, 29}_1 ∨ -b^{14, 29}_0 ∨ false 
c  in DIMACS:
-12350 -12351 -12352  0

c i = 30
c  -2+1 --> -1
c    ( b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧  p_420) -> ( b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0)
c  in CNF:
c    -b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨  b^{14, 31}_2
c    -b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_1
c    -b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨  b^{14, 31}_0
c  in DIMACS:
-12353 -12354  12355 -420  12356 0
-12353 -12354  12355 -420 -12357 0
-12353 -12354  12355 -420  12358 0

c  -1+1 --> 0
c    ( b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0 ∧  p_420) -> (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧ -b^{14, 31}_0)
c  in CNF:
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_2
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_1
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_0
c  in DIMACS:
-12353  12354 -12355 -420 -12356 0
-12353  12354 -12355 -420 -12357 0
-12353  12354 -12355 -420 -12358 0

c  0+1 --> 1
c    (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧  p_420) -> (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0)
c  in CNF:
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_2
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_1
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨  b^{14, 31}_0
c  in DIMACS:
 12353  12354  12355 -420 -12356 0
 12353  12354  12355 -420 -12357 0
 12353  12354  12355 -420  12358 0

c  1+1 --> 2
c    (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0 ∧  p_420) -> (-b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0)
c  in CNF:
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_2
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨  b^{14, 31}_1
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ -p_420 ∨ -b^{14, 31}_0
c  in DIMACS:
 12353  12354 -12355 -420 -12356 0
 12353  12354 -12355 -420  12357 0
 12353  12354 -12355 -420 -12358 0

c  2+1 --> break 
c    (-b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧  p_420) -> break
c  in CNF:
c     b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 12353 -12354  12355 -420 1162 0


c  2-1 --> 1
c    (-b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧ -p_420) -> (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0)
c  in CNF:
c     b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_2
c     b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_1
c     b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨  b^{14, 31}_0
c  in DIMACS:
 12353 -12354  12355  420 -12356 0
 12353 -12354  12355  420 -12357 0
 12353 -12354  12355  420  12358 0

c  1-1 --> 0
c    (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0 ∧ -p_420) -> (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧ -b^{14, 31}_0)
c  in CNF:
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_2
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_1
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_0
c  in DIMACS:
 12353  12354 -12355  420 -12356 0
 12353  12354 -12355  420 -12357 0
 12353  12354 -12355  420 -12358 0

c  0-1 --> -1
c    (-b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧ -p_420) -> ( b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0)
c  in CNF:
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨  b^{14, 31}_2
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_1
c     b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨  b^{14, 31}_0
c  in DIMACS:
 12353  12354  12355  420  12356 0
 12353  12354  12355  420 -12357 0
 12353  12354  12355  420  12358 0

c  -1-1 --> -2
c    ( b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧  b^{14, 30}_0 ∧ -p_420) -> ( b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0)
c  in CNF:
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨  b^{14, 31}_2
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨  b^{14, 31}_1
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨  p_420 ∨ -b^{14, 31}_0
c  in DIMACS:
-12353  12354 -12355  420  12356 0
-12353  12354 -12355  420  12357 0
-12353  12354 -12355  420 -12358 0

c  -2-1 --> break 
c    ( b^{14, 30}_2 ∧  b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨  b^{14, 30}_0 ∨  p_420 ∨ break
c  in DIMACS:
-12353 -12354  12355  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 30}_2 ∧ -b^{14, 30}_1 ∧ -b^{14, 30}_0 ∧ true) 
c  in CNF:
c    -b^{14, 30}_2 ∨  b^{14, 30}_1 ∨  b^{14, 30}_0 ∨ false 
c  in DIMACS:
-12353  12354  12355  0

c  3 does not represent an automaton state.
c    -(-b^{14, 30}_2 ∧  b^{14, 30}_1 ∧  b^{14, 30}_0 ∧ true) 
c  in CNF:
c     b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ false 
c  in DIMACS:
 12353 -12354 -12355  0
c  -3 does not represent an automaton state.
c    -( b^{14, 30}_2 ∧  b^{14, 30}_1 ∧  b^{14, 30}_0 ∧ true) 
c  in CNF:
c    -b^{14, 30}_2 ∨ -b^{14, 30}_1 ∨ -b^{14, 30}_0 ∨ false 
c  in DIMACS:
-12353 -12354 -12355  0

c i = 31
c  -2+1 --> -1
c    ( b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧  p_434) -> ( b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0)
c  in CNF:
c    -b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨  b^{14, 32}_2
c    -b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_1
c    -b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨  b^{14, 32}_0
c  in DIMACS:
-12356 -12357  12358 -434  12359 0
-12356 -12357  12358 -434 -12360 0
-12356 -12357  12358 -434  12361 0

c  -1+1 --> 0
c    ( b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0 ∧  p_434) -> (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧ -b^{14, 32}_0)
c  in CNF:
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_2
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_1
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_0
c  in DIMACS:
-12356  12357 -12358 -434 -12359 0
-12356  12357 -12358 -434 -12360 0
-12356  12357 -12358 -434 -12361 0

c  0+1 --> 1
c    (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧  p_434) -> (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0)
c  in CNF:
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_2
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_1
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨  b^{14, 32}_0
c  in DIMACS:
 12356  12357  12358 -434 -12359 0
 12356  12357  12358 -434 -12360 0
 12356  12357  12358 -434  12361 0

c  1+1 --> 2
c    (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0 ∧  p_434) -> (-b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0)
c  in CNF:
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_2
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨  b^{14, 32}_1
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ -p_434 ∨ -b^{14, 32}_0
c  in DIMACS:
 12356  12357 -12358 -434 -12359 0
 12356  12357 -12358 -434  12360 0
 12356  12357 -12358 -434 -12361 0

c  2+1 --> break 
c    (-b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧  p_434) -> break
c  in CNF:
c     b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 12356 -12357  12358 -434 1162 0


c  2-1 --> 1
c    (-b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧ -p_434) -> (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0)
c  in CNF:
c     b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_2
c     b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_1
c     b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨  b^{14, 32}_0
c  in DIMACS:
 12356 -12357  12358  434 -12359 0
 12356 -12357  12358  434 -12360 0
 12356 -12357  12358  434  12361 0

c  1-1 --> 0
c    (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0 ∧ -p_434) -> (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧ -b^{14, 32}_0)
c  in CNF:
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_2
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_1
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_0
c  in DIMACS:
 12356  12357 -12358  434 -12359 0
 12356  12357 -12358  434 -12360 0
 12356  12357 -12358  434 -12361 0

c  0-1 --> -1
c    (-b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧ -p_434) -> ( b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0)
c  in CNF:
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨  b^{14, 32}_2
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_1
c     b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨  b^{14, 32}_0
c  in DIMACS:
 12356  12357  12358  434  12359 0
 12356  12357  12358  434 -12360 0
 12356  12357  12358  434  12361 0

c  -1-1 --> -2
c    ( b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧  b^{14, 31}_0 ∧ -p_434) -> ( b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0)
c  in CNF:
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨  b^{14, 32}_2
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨  b^{14, 32}_1
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨  p_434 ∨ -b^{14, 32}_0
c  in DIMACS:
-12356  12357 -12358  434  12359 0
-12356  12357 -12358  434  12360 0
-12356  12357 -12358  434 -12361 0

c  -2-1 --> break 
c    ( b^{14, 31}_2 ∧  b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨  b^{14, 31}_0 ∨  p_434 ∨ break
c  in DIMACS:
-12356 -12357  12358  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 31}_2 ∧ -b^{14, 31}_1 ∧ -b^{14, 31}_0 ∧ true) 
c  in CNF:
c    -b^{14, 31}_2 ∨  b^{14, 31}_1 ∨  b^{14, 31}_0 ∨ false 
c  in DIMACS:
-12356  12357  12358  0

c  3 does not represent an automaton state.
c    -(-b^{14, 31}_2 ∧  b^{14, 31}_1 ∧  b^{14, 31}_0 ∧ true) 
c  in CNF:
c     b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ false 
c  in DIMACS:
 12356 -12357 -12358  0
c  -3 does not represent an automaton state.
c    -( b^{14, 31}_2 ∧  b^{14, 31}_1 ∧  b^{14, 31}_0 ∧ true) 
c  in CNF:
c    -b^{14, 31}_2 ∨ -b^{14, 31}_1 ∨ -b^{14, 31}_0 ∨ false 
c  in DIMACS:
-12356 -12357 -12358  0

c i = 32
c  -2+1 --> -1
c    ( b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧  p_448) -> ( b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0)
c  in CNF:
c    -b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨  b^{14, 33}_2
c    -b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_1
c    -b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨  b^{14, 33}_0
c  in DIMACS:
-12359 -12360  12361 -448  12362 0
-12359 -12360  12361 -448 -12363 0
-12359 -12360  12361 -448  12364 0

c  -1+1 --> 0
c    ( b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0 ∧  p_448) -> (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧ -b^{14, 33}_0)
c  in CNF:
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_2
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_1
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_0
c  in DIMACS:
-12359  12360 -12361 -448 -12362 0
-12359  12360 -12361 -448 -12363 0
-12359  12360 -12361 -448 -12364 0

c  0+1 --> 1
c    (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧  p_448) -> (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0)
c  in CNF:
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_2
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_1
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨  b^{14, 33}_0
c  in DIMACS:
 12359  12360  12361 -448 -12362 0
 12359  12360  12361 -448 -12363 0
 12359  12360  12361 -448  12364 0

c  1+1 --> 2
c    (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0 ∧  p_448) -> (-b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0)
c  in CNF:
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_2
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨  b^{14, 33}_1
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ -p_448 ∨ -b^{14, 33}_0
c  in DIMACS:
 12359  12360 -12361 -448 -12362 0
 12359  12360 -12361 -448  12363 0
 12359  12360 -12361 -448 -12364 0

c  2+1 --> break 
c    (-b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧  p_448) -> break
c  in CNF:
c     b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 12359 -12360  12361 -448 1162 0


c  2-1 --> 1
c    (-b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧ -p_448) -> (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0)
c  in CNF:
c     b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_2
c     b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_1
c     b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨  b^{14, 33}_0
c  in DIMACS:
 12359 -12360  12361  448 -12362 0
 12359 -12360  12361  448 -12363 0
 12359 -12360  12361  448  12364 0

c  1-1 --> 0
c    (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0 ∧ -p_448) -> (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧ -b^{14, 33}_0)
c  in CNF:
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_2
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_1
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_0
c  in DIMACS:
 12359  12360 -12361  448 -12362 0
 12359  12360 -12361  448 -12363 0
 12359  12360 -12361  448 -12364 0

c  0-1 --> -1
c    (-b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧ -p_448) -> ( b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0)
c  in CNF:
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨  b^{14, 33}_2
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_1
c     b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨  b^{14, 33}_0
c  in DIMACS:
 12359  12360  12361  448  12362 0
 12359  12360  12361  448 -12363 0
 12359  12360  12361  448  12364 0

c  -1-1 --> -2
c    ( b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧  b^{14, 32}_0 ∧ -p_448) -> ( b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0)
c  in CNF:
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨  b^{14, 33}_2
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨  b^{14, 33}_1
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨  p_448 ∨ -b^{14, 33}_0
c  in DIMACS:
-12359  12360 -12361  448  12362 0
-12359  12360 -12361  448  12363 0
-12359  12360 -12361  448 -12364 0

c  -2-1 --> break 
c    ( b^{14, 32}_2 ∧  b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨  b^{14, 32}_0 ∨  p_448 ∨ break
c  in DIMACS:
-12359 -12360  12361  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 32}_2 ∧ -b^{14, 32}_1 ∧ -b^{14, 32}_0 ∧ true) 
c  in CNF:
c    -b^{14, 32}_2 ∨  b^{14, 32}_1 ∨  b^{14, 32}_0 ∨ false 
c  in DIMACS:
-12359  12360  12361  0

c  3 does not represent an automaton state.
c    -(-b^{14, 32}_2 ∧  b^{14, 32}_1 ∧  b^{14, 32}_0 ∧ true) 
c  in CNF:
c     b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ false 
c  in DIMACS:
 12359 -12360 -12361  0
c  -3 does not represent an automaton state.
c    -( b^{14, 32}_2 ∧  b^{14, 32}_1 ∧  b^{14, 32}_0 ∧ true) 
c  in CNF:
c    -b^{14, 32}_2 ∨ -b^{14, 32}_1 ∨ -b^{14, 32}_0 ∨ false 
c  in DIMACS:
-12359 -12360 -12361  0

c i = 33
c  -2+1 --> -1
c    ( b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧  p_462) -> ( b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0)
c  in CNF:
c    -b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨  b^{14, 34}_2
c    -b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_1
c    -b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨  b^{14, 34}_0
c  in DIMACS:
-12362 -12363  12364 -462  12365 0
-12362 -12363  12364 -462 -12366 0
-12362 -12363  12364 -462  12367 0

c  -1+1 --> 0
c    ( b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0 ∧  p_462) -> (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧ -b^{14, 34}_0)
c  in CNF:
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_2
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_1
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_0
c  in DIMACS:
-12362  12363 -12364 -462 -12365 0
-12362  12363 -12364 -462 -12366 0
-12362  12363 -12364 -462 -12367 0

c  0+1 --> 1
c    (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧  p_462) -> (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0)
c  in CNF:
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_2
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_1
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨  b^{14, 34}_0
c  in DIMACS:
 12362  12363  12364 -462 -12365 0
 12362  12363  12364 -462 -12366 0
 12362  12363  12364 -462  12367 0

c  1+1 --> 2
c    (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0 ∧  p_462) -> (-b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0)
c  in CNF:
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_2
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨  b^{14, 34}_1
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ -p_462 ∨ -b^{14, 34}_0
c  in DIMACS:
 12362  12363 -12364 -462 -12365 0
 12362  12363 -12364 -462  12366 0
 12362  12363 -12364 -462 -12367 0

c  2+1 --> break 
c    (-b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧  p_462) -> break
c  in CNF:
c     b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 12362 -12363  12364 -462 1162 0


c  2-1 --> 1
c    (-b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧ -p_462) -> (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0)
c  in CNF:
c     b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_2
c     b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_1
c     b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨  b^{14, 34}_0
c  in DIMACS:
 12362 -12363  12364  462 -12365 0
 12362 -12363  12364  462 -12366 0
 12362 -12363  12364  462  12367 0

c  1-1 --> 0
c    (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0 ∧ -p_462) -> (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧ -b^{14, 34}_0)
c  in CNF:
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_2
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_1
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_0
c  in DIMACS:
 12362  12363 -12364  462 -12365 0
 12362  12363 -12364  462 -12366 0
 12362  12363 -12364  462 -12367 0

c  0-1 --> -1
c    (-b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧ -p_462) -> ( b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0)
c  in CNF:
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨  b^{14, 34}_2
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_1
c     b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨  b^{14, 34}_0
c  in DIMACS:
 12362  12363  12364  462  12365 0
 12362  12363  12364  462 -12366 0
 12362  12363  12364  462  12367 0

c  -1-1 --> -2
c    ( b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧  b^{14, 33}_0 ∧ -p_462) -> ( b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0)
c  in CNF:
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨  b^{14, 34}_2
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨  b^{14, 34}_1
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨  p_462 ∨ -b^{14, 34}_0
c  in DIMACS:
-12362  12363 -12364  462  12365 0
-12362  12363 -12364  462  12366 0
-12362  12363 -12364  462 -12367 0

c  -2-1 --> break 
c    ( b^{14, 33}_2 ∧  b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨  b^{14, 33}_0 ∨  p_462 ∨ break
c  in DIMACS:
-12362 -12363  12364  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 33}_2 ∧ -b^{14, 33}_1 ∧ -b^{14, 33}_0 ∧ true) 
c  in CNF:
c    -b^{14, 33}_2 ∨  b^{14, 33}_1 ∨  b^{14, 33}_0 ∨ false 
c  in DIMACS:
-12362  12363  12364  0

c  3 does not represent an automaton state.
c    -(-b^{14, 33}_2 ∧  b^{14, 33}_1 ∧  b^{14, 33}_0 ∧ true) 
c  in CNF:
c     b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ false 
c  in DIMACS:
 12362 -12363 -12364  0
c  -3 does not represent an automaton state.
c    -( b^{14, 33}_2 ∧  b^{14, 33}_1 ∧  b^{14, 33}_0 ∧ true) 
c  in CNF:
c    -b^{14, 33}_2 ∨ -b^{14, 33}_1 ∨ -b^{14, 33}_0 ∨ false 
c  in DIMACS:
-12362 -12363 -12364  0

c i = 34
c  -2+1 --> -1
c    ( b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧  p_476) -> ( b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0)
c  in CNF:
c    -b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨  b^{14, 35}_2
c    -b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_1
c    -b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨  b^{14, 35}_0
c  in DIMACS:
-12365 -12366  12367 -476  12368 0
-12365 -12366  12367 -476 -12369 0
-12365 -12366  12367 -476  12370 0

c  -1+1 --> 0
c    ( b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0 ∧  p_476) -> (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧ -b^{14, 35}_0)
c  in CNF:
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_2
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_1
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_0
c  in DIMACS:
-12365  12366 -12367 -476 -12368 0
-12365  12366 -12367 -476 -12369 0
-12365  12366 -12367 -476 -12370 0

c  0+1 --> 1
c    (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧  p_476) -> (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0)
c  in CNF:
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_2
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_1
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨  b^{14, 35}_0
c  in DIMACS:
 12365  12366  12367 -476 -12368 0
 12365  12366  12367 -476 -12369 0
 12365  12366  12367 -476  12370 0

c  1+1 --> 2
c    (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0 ∧  p_476) -> (-b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0)
c  in CNF:
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_2
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨  b^{14, 35}_1
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ -p_476 ∨ -b^{14, 35}_0
c  in DIMACS:
 12365  12366 -12367 -476 -12368 0
 12365  12366 -12367 -476  12369 0
 12365  12366 -12367 -476 -12370 0

c  2+1 --> break 
c    (-b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧  p_476) -> break
c  in CNF:
c     b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 12365 -12366  12367 -476 1162 0


c  2-1 --> 1
c    (-b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧ -p_476) -> (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0)
c  in CNF:
c     b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_2
c     b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_1
c     b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨  b^{14, 35}_0
c  in DIMACS:
 12365 -12366  12367  476 -12368 0
 12365 -12366  12367  476 -12369 0
 12365 -12366  12367  476  12370 0

c  1-1 --> 0
c    (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0 ∧ -p_476) -> (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧ -b^{14, 35}_0)
c  in CNF:
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_2
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_1
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_0
c  in DIMACS:
 12365  12366 -12367  476 -12368 0
 12365  12366 -12367  476 -12369 0
 12365  12366 -12367  476 -12370 0

c  0-1 --> -1
c    (-b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧ -p_476) -> ( b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0)
c  in CNF:
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨  b^{14, 35}_2
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_1
c     b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨  b^{14, 35}_0
c  in DIMACS:
 12365  12366  12367  476  12368 0
 12365  12366  12367  476 -12369 0
 12365  12366  12367  476  12370 0

c  -1-1 --> -2
c    ( b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧  b^{14, 34}_0 ∧ -p_476) -> ( b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0)
c  in CNF:
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨  b^{14, 35}_2
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨  b^{14, 35}_1
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨  p_476 ∨ -b^{14, 35}_0
c  in DIMACS:
-12365  12366 -12367  476  12368 0
-12365  12366 -12367  476  12369 0
-12365  12366 -12367  476 -12370 0

c  -2-1 --> break 
c    ( b^{14, 34}_2 ∧  b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨  b^{14, 34}_0 ∨  p_476 ∨ break
c  in DIMACS:
-12365 -12366  12367  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 34}_2 ∧ -b^{14, 34}_1 ∧ -b^{14, 34}_0 ∧ true) 
c  in CNF:
c    -b^{14, 34}_2 ∨  b^{14, 34}_1 ∨  b^{14, 34}_0 ∨ false 
c  in DIMACS:
-12365  12366  12367  0

c  3 does not represent an automaton state.
c    -(-b^{14, 34}_2 ∧  b^{14, 34}_1 ∧  b^{14, 34}_0 ∧ true) 
c  in CNF:
c     b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ false 
c  in DIMACS:
 12365 -12366 -12367  0
c  -3 does not represent an automaton state.
c    -( b^{14, 34}_2 ∧  b^{14, 34}_1 ∧  b^{14, 34}_0 ∧ true) 
c  in CNF:
c    -b^{14, 34}_2 ∨ -b^{14, 34}_1 ∨ -b^{14, 34}_0 ∨ false 
c  in DIMACS:
-12365 -12366 -12367  0

c i = 35
c  -2+1 --> -1
c    ( b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧  p_490) -> ( b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0)
c  in CNF:
c    -b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨  b^{14, 36}_2
c    -b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_1
c    -b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨  b^{14, 36}_0
c  in DIMACS:
-12368 -12369  12370 -490  12371 0
-12368 -12369  12370 -490 -12372 0
-12368 -12369  12370 -490  12373 0

c  -1+1 --> 0
c    ( b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0 ∧  p_490) -> (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧ -b^{14, 36}_0)
c  in CNF:
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_2
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_1
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_0
c  in DIMACS:
-12368  12369 -12370 -490 -12371 0
-12368  12369 -12370 -490 -12372 0
-12368  12369 -12370 -490 -12373 0

c  0+1 --> 1
c    (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧  p_490) -> (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0)
c  in CNF:
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_2
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_1
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨  b^{14, 36}_0
c  in DIMACS:
 12368  12369  12370 -490 -12371 0
 12368  12369  12370 -490 -12372 0
 12368  12369  12370 -490  12373 0

c  1+1 --> 2
c    (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0 ∧  p_490) -> (-b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0)
c  in CNF:
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_2
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨  b^{14, 36}_1
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ -p_490 ∨ -b^{14, 36}_0
c  in DIMACS:
 12368  12369 -12370 -490 -12371 0
 12368  12369 -12370 -490  12372 0
 12368  12369 -12370 -490 -12373 0

c  2+1 --> break 
c    (-b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧  p_490) -> break
c  in CNF:
c     b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 12368 -12369  12370 -490 1162 0


c  2-1 --> 1
c    (-b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧ -p_490) -> (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0)
c  in CNF:
c     b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_2
c     b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_1
c     b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨  b^{14, 36}_0
c  in DIMACS:
 12368 -12369  12370  490 -12371 0
 12368 -12369  12370  490 -12372 0
 12368 -12369  12370  490  12373 0

c  1-1 --> 0
c    (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0 ∧ -p_490) -> (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧ -b^{14, 36}_0)
c  in CNF:
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_2
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_1
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_0
c  in DIMACS:
 12368  12369 -12370  490 -12371 0
 12368  12369 -12370  490 -12372 0
 12368  12369 -12370  490 -12373 0

c  0-1 --> -1
c    (-b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧ -p_490) -> ( b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0)
c  in CNF:
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨  b^{14, 36}_2
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_1
c     b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨  b^{14, 36}_0
c  in DIMACS:
 12368  12369  12370  490  12371 0
 12368  12369  12370  490 -12372 0
 12368  12369  12370  490  12373 0

c  -1-1 --> -2
c    ( b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧  b^{14, 35}_0 ∧ -p_490) -> ( b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0)
c  in CNF:
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨  b^{14, 36}_2
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨  b^{14, 36}_1
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨  p_490 ∨ -b^{14, 36}_0
c  in DIMACS:
-12368  12369 -12370  490  12371 0
-12368  12369 -12370  490  12372 0
-12368  12369 -12370  490 -12373 0

c  -2-1 --> break 
c    ( b^{14, 35}_2 ∧  b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨  b^{14, 35}_0 ∨  p_490 ∨ break
c  in DIMACS:
-12368 -12369  12370  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 35}_2 ∧ -b^{14, 35}_1 ∧ -b^{14, 35}_0 ∧ true) 
c  in CNF:
c    -b^{14, 35}_2 ∨  b^{14, 35}_1 ∨  b^{14, 35}_0 ∨ false 
c  in DIMACS:
-12368  12369  12370  0

c  3 does not represent an automaton state.
c    -(-b^{14, 35}_2 ∧  b^{14, 35}_1 ∧  b^{14, 35}_0 ∧ true) 
c  in CNF:
c     b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ false 
c  in DIMACS:
 12368 -12369 -12370  0
c  -3 does not represent an automaton state.
c    -( b^{14, 35}_2 ∧  b^{14, 35}_1 ∧  b^{14, 35}_0 ∧ true) 
c  in CNF:
c    -b^{14, 35}_2 ∨ -b^{14, 35}_1 ∨ -b^{14, 35}_0 ∨ false 
c  in DIMACS:
-12368 -12369 -12370  0

c i = 36
c  -2+1 --> -1
c    ( b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧  p_504) -> ( b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0)
c  in CNF:
c    -b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨  b^{14, 37}_2
c    -b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_1
c    -b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨  b^{14, 37}_0
c  in DIMACS:
-12371 -12372  12373 -504  12374 0
-12371 -12372  12373 -504 -12375 0
-12371 -12372  12373 -504  12376 0

c  -1+1 --> 0
c    ( b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0 ∧  p_504) -> (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧ -b^{14, 37}_0)
c  in CNF:
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_2
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_1
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_0
c  in DIMACS:
-12371  12372 -12373 -504 -12374 0
-12371  12372 -12373 -504 -12375 0
-12371  12372 -12373 -504 -12376 0

c  0+1 --> 1
c    (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧  p_504) -> (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0)
c  in CNF:
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_2
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_1
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨  b^{14, 37}_0
c  in DIMACS:
 12371  12372  12373 -504 -12374 0
 12371  12372  12373 -504 -12375 0
 12371  12372  12373 -504  12376 0

c  1+1 --> 2
c    (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0 ∧  p_504) -> (-b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0)
c  in CNF:
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_2
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨  b^{14, 37}_1
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ -p_504 ∨ -b^{14, 37}_0
c  in DIMACS:
 12371  12372 -12373 -504 -12374 0
 12371  12372 -12373 -504  12375 0
 12371  12372 -12373 -504 -12376 0

c  2+1 --> break 
c    (-b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧  p_504) -> break
c  in CNF:
c     b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 12371 -12372  12373 -504 1162 0


c  2-1 --> 1
c    (-b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧ -p_504) -> (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0)
c  in CNF:
c     b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_2
c     b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_1
c     b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨  b^{14, 37}_0
c  in DIMACS:
 12371 -12372  12373  504 -12374 0
 12371 -12372  12373  504 -12375 0
 12371 -12372  12373  504  12376 0

c  1-1 --> 0
c    (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0 ∧ -p_504) -> (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧ -b^{14, 37}_0)
c  in CNF:
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_2
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_1
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_0
c  in DIMACS:
 12371  12372 -12373  504 -12374 0
 12371  12372 -12373  504 -12375 0
 12371  12372 -12373  504 -12376 0

c  0-1 --> -1
c    (-b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧ -p_504) -> ( b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0)
c  in CNF:
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨  b^{14, 37}_2
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_1
c     b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨  b^{14, 37}_0
c  in DIMACS:
 12371  12372  12373  504  12374 0
 12371  12372  12373  504 -12375 0
 12371  12372  12373  504  12376 0

c  -1-1 --> -2
c    ( b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧  b^{14, 36}_0 ∧ -p_504) -> ( b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0)
c  in CNF:
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨  b^{14, 37}_2
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨  b^{14, 37}_1
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨  p_504 ∨ -b^{14, 37}_0
c  in DIMACS:
-12371  12372 -12373  504  12374 0
-12371  12372 -12373  504  12375 0
-12371  12372 -12373  504 -12376 0

c  -2-1 --> break 
c    ( b^{14, 36}_2 ∧  b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨  b^{14, 36}_0 ∨  p_504 ∨ break
c  in DIMACS:
-12371 -12372  12373  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 36}_2 ∧ -b^{14, 36}_1 ∧ -b^{14, 36}_0 ∧ true) 
c  in CNF:
c    -b^{14, 36}_2 ∨  b^{14, 36}_1 ∨  b^{14, 36}_0 ∨ false 
c  in DIMACS:
-12371  12372  12373  0

c  3 does not represent an automaton state.
c    -(-b^{14, 36}_2 ∧  b^{14, 36}_1 ∧  b^{14, 36}_0 ∧ true) 
c  in CNF:
c     b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ false 
c  in DIMACS:
 12371 -12372 -12373  0
c  -3 does not represent an automaton state.
c    -( b^{14, 36}_2 ∧  b^{14, 36}_1 ∧  b^{14, 36}_0 ∧ true) 
c  in CNF:
c    -b^{14, 36}_2 ∨ -b^{14, 36}_1 ∨ -b^{14, 36}_0 ∨ false 
c  in DIMACS:
-12371 -12372 -12373  0

c i = 37
c  -2+1 --> -1
c    ( b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧  p_518) -> ( b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0)
c  in CNF:
c    -b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨  b^{14, 38}_2
c    -b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_1
c    -b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨  b^{14, 38}_0
c  in DIMACS:
-12374 -12375  12376 -518  12377 0
-12374 -12375  12376 -518 -12378 0
-12374 -12375  12376 -518  12379 0

c  -1+1 --> 0
c    ( b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0 ∧  p_518) -> (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧ -b^{14, 38}_0)
c  in CNF:
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_2
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_1
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_0
c  in DIMACS:
-12374  12375 -12376 -518 -12377 0
-12374  12375 -12376 -518 -12378 0
-12374  12375 -12376 -518 -12379 0

c  0+1 --> 1
c    (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧  p_518) -> (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0)
c  in CNF:
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_2
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_1
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨  b^{14, 38}_0
c  in DIMACS:
 12374  12375  12376 -518 -12377 0
 12374  12375  12376 -518 -12378 0
 12374  12375  12376 -518  12379 0

c  1+1 --> 2
c    (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0 ∧  p_518) -> (-b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0)
c  in CNF:
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_2
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨  b^{14, 38}_1
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ -p_518 ∨ -b^{14, 38}_0
c  in DIMACS:
 12374  12375 -12376 -518 -12377 0
 12374  12375 -12376 -518  12378 0
 12374  12375 -12376 -518 -12379 0

c  2+1 --> break 
c    (-b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧  p_518) -> break
c  in CNF:
c     b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 12374 -12375  12376 -518 1162 0


c  2-1 --> 1
c    (-b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧ -p_518) -> (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0)
c  in CNF:
c     b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_2
c     b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_1
c     b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨  b^{14, 38}_0
c  in DIMACS:
 12374 -12375  12376  518 -12377 0
 12374 -12375  12376  518 -12378 0
 12374 -12375  12376  518  12379 0

c  1-1 --> 0
c    (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0 ∧ -p_518) -> (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧ -b^{14, 38}_0)
c  in CNF:
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_2
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_1
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_0
c  in DIMACS:
 12374  12375 -12376  518 -12377 0
 12374  12375 -12376  518 -12378 0
 12374  12375 -12376  518 -12379 0

c  0-1 --> -1
c    (-b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧ -p_518) -> ( b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0)
c  in CNF:
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨  b^{14, 38}_2
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_1
c     b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨  b^{14, 38}_0
c  in DIMACS:
 12374  12375  12376  518  12377 0
 12374  12375  12376  518 -12378 0
 12374  12375  12376  518  12379 0

c  -1-1 --> -2
c    ( b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧  b^{14, 37}_0 ∧ -p_518) -> ( b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0)
c  in CNF:
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨  b^{14, 38}_2
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨  b^{14, 38}_1
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨  p_518 ∨ -b^{14, 38}_0
c  in DIMACS:
-12374  12375 -12376  518  12377 0
-12374  12375 -12376  518  12378 0
-12374  12375 -12376  518 -12379 0

c  -2-1 --> break 
c    ( b^{14, 37}_2 ∧  b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨  b^{14, 37}_0 ∨  p_518 ∨ break
c  in DIMACS:
-12374 -12375  12376  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 37}_2 ∧ -b^{14, 37}_1 ∧ -b^{14, 37}_0 ∧ true) 
c  in CNF:
c    -b^{14, 37}_2 ∨  b^{14, 37}_1 ∨  b^{14, 37}_0 ∨ false 
c  in DIMACS:
-12374  12375  12376  0

c  3 does not represent an automaton state.
c    -(-b^{14, 37}_2 ∧  b^{14, 37}_1 ∧  b^{14, 37}_0 ∧ true) 
c  in CNF:
c     b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ false 
c  in DIMACS:
 12374 -12375 -12376  0
c  -3 does not represent an automaton state.
c    -( b^{14, 37}_2 ∧  b^{14, 37}_1 ∧  b^{14, 37}_0 ∧ true) 
c  in CNF:
c    -b^{14, 37}_2 ∨ -b^{14, 37}_1 ∨ -b^{14, 37}_0 ∨ false 
c  in DIMACS:
-12374 -12375 -12376  0

c i = 38
c  -2+1 --> -1
c    ( b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧  p_532) -> ( b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0)
c  in CNF:
c    -b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨  b^{14, 39}_2
c    -b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_1
c    -b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨  b^{14, 39}_0
c  in DIMACS:
-12377 -12378  12379 -532  12380 0
-12377 -12378  12379 -532 -12381 0
-12377 -12378  12379 -532  12382 0

c  -1+1 --> 0
c    ( b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0 ∧  p_532) -> (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧ -b^{14, 39}_0)
c  in CNF:
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_2
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_1
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_0
c  in DIMACS:
-12377  12378 -12379 -532 -12380 0
-12377  12378 -12379 -532 -12381 0
-12377  12378 -12379 -532 -12382 0

c  0+1 --> 1
c    (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧  p_532) -> (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0)
c  in CNF:
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_2
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_1
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨  b^{14, 39}_0
c  in DIMACS:
 12377  12378  12379 -532 -12380 0
 12377  12378  12379 -532 -12381 0
 12377  12378  12379 -532  12382 0

c  1+1 --> 2
c    (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0 ∧  p_532) -> (-b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0)
c  in CNF:
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_2
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨  b^{14, 39}_1
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ -p_532 ∨ -b^{14, 39}_0
c  in DIMACS:
 12377  12378 -12379 -532 -12380 0
 12377  12378 -12379 -532  12381 0
 12377  12378 -12379 -532 -12382 0

c  2+1 --> break 
c    (-b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧  p_532) -> break
c  in CNF:
c     b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 12377 -12378  12379 -532 1162 0


c  2-1 --> 1
c    (-b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧ -p_532) -> (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0)
c  in CNF:
c     b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_2
c     b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_1
c     b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨  b^{14, 39}_0
c  in DIMACS:
 12377 -12378  12379  532 -12380 0
 12377 -12378  12379  532 -12381 0
 12377 -12378  12379  532  12382 0

c  1-1 --> 0
c    (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0 ∧ -p_532) -> (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧ -b^{14, 39}_0)
c  in CNF:
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_2
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_1
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_0
c  in DIMACS:
 12377  12378 -12379  532 -12380 0
 12377  12378 -12379  532 -12381 0
 12377  12378 -12379  532 -12382 0

c  0-1 --> -1
c    (-b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧ -p_532) -> ( b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0)
c  in CNF:
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨  b^{14, 39}_2
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_1
c     b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨  b^{14, 39}_0
c  in DIMACS:
 12377  12378  12379  532  12380 0
 12377  12378  12379  532 -12381 0
 12377  12378  12379  532  12382 0

c  -1-1 --> -2
c    ( b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧  b^{14, 38}_0 ∧ -p_532) -> ( b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0)
c  in CNF:
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨  b^{14, 39}_2
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨  b^{14, 39}_1
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨  p_532 ∨ -b^{14, 39}_0
c  in DIMACS:
-12377  12378 -12379  532  12380 0
-12377  12378 -12379  532  12381 0
-12377  12378 -12379  532 -12382 0

c  -2-1 --> break 
c    ( b^{14, 38}_2 ∧  b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨  b^{14, 38}_0 ∨  p_532 ∨ break
c  in DIMACS:
-12377 -12378  12379  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 38}_2 ∧ -b^{14, 38}_1 ∧ -b^{14, 38}_0 ∧ true) 
c  in CNF:
c    -b^{14, 38}_2 ∨  b^{14, 38}_1 ∨  b^{14, 38}_0 ∨ false 
c  in DIMACS:
-12377  12378  12379  0

c  3 does not represent an automaton state.
c    -(-b^{14, 38}_2 ∧  b^{14, 38}_1 ∧  b^{14, 38}_0 ∧ true) 
c  in CNF:
c     b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ false 
c  in DIMACS:
 12377 -12378 -12379  0
c  -3 does not represent an automaton state.
c    -( b^{14, 38}_2 ∧  b^{14, 38}_1 ∧  b^{14, 38}_0 ∧ true) 
c  in CNF:
c    -b^{14, 38}_2 ∨ -b^{14, 38}_1 ∨ -b^{14, 38}_0 ∨ false 
c  in DIMACS:
-12377 -12378 -12379  0

c i = 39
c  -2+1 --> -1
c    ( b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧  p_546) -> ( b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0)
c  in CNF:
c    -b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨  b^{14, 40}_2
c    -b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_1
c    -b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨  b^{14, 40}_0
c  in DIMACS:
-12380 -12381  12382 -546  12383 0
-12380 -12381  12382 -546 -12384 0
-12380 -12381  12382 -546  12385 0

c  -1+1 --> 0
c    ( b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0 ∧  p_546) -> (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧ -b^{14, 40}_0)
c  in CNF:
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_2
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_1
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_0
c  in DIMACS:
-12380  12381 -12382 -546 -12383 0
-12380  12381 -12382 -546 -12384 0
-12380  12381 -12382 -546 -12385 0

c  0+1 --> 1
c    (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧  p_546) -> (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0)
c  in CNF:
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_2
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_1
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨  b^{14, 40}_0
c  in DIMACS:
 12380  12381  12382 -546 -12383 0
 12380  12381  12382 -546 -12384 0
 12380  12381  12382 -546  12385 0

c  1+1 --> 2
c    (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0 ∧  p_546) -> (-b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0)
c  in CNF:
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_2
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨  b^{14, 40}_1
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ -p_546 ∨ -b^{14, 40}_0
c  in DIMACS:
 12380  12381 -12382 -546 -12383 0
 12380  12381 -12382 -546  12384 0
 12380  12381 -12382 -546 -12385 0

c  2+1 --> break 
c    (-b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧  p_546) -> break
c  in CNF:
c     b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 12380 -12381  12382 -546 1162 0


c  2-1 --> 1
c    (-b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧ -p_546) -> (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0)
c  in CNF:
c     b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_2
c     b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_1
c     b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨  b^{14, 40}_0
c  in DIMACS:
 12380 -12381  12382  546 -12383 0
 12380 -12381  12382  546 -12384 0
 12380 -12381  12382  546  12385 0

c  1-1 --> 0
c    (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0 ∧ -p_546) -> (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧ -b^{14, 40}_0)
c  in CNF:
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_2
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_1
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_0
c  in DIMACS:
 12380  12381 -12382  546 -12383 0
 12380  12381 -12382  546 -12384 0
 12380  12381 -12382  546 -12385 0

c  0-1 --> -1
c    (-b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧ -p_546) -> ( b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0)
c  in CNF:
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨  b^{14, 40}_2
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_1
c     b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨  b^{14, 40}_0
c  in DIMACS:
 12380  12381  12382  546  12383 0
 12380  12381  12382  546 -12384 0
 12380  12381  12382  546  12385 0

c  -1-1 --> -2
c    ( b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧  b^{14, 39}_0 ∧ -p_546) -> ( b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0)
c  in CNF:
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨  b^{14, 40}_2
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨  b^{14, 40}_1
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨  p_546 ∨ -b^{14, 40}_0
c  in DIMACS:
-12380  12381 -12382  546  12383 0
-12380  12381 -12382  546  12384 0
-12380  12381 -12382  546 -12385 0

c  -2-1 --> break 
c    ( b^{14, 39}_2 ∧  b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨  b^{14, 39}_0 ∨  p_546 ∨ break
c  in DIMACS:
-12380 -12381  12382  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 39}_2 ∧ -b^{14, 39}_1 ∧ -b^{14, 39}_0 ∧ true) 
c  in CNF:
c    -b^{14, 39}_2 ∨  b^{14, 39}_1 ∨  b^{14, 39}_0 ∨ false 
c  in DIMACS:
-12380  12381  12382  0

c  3 does not represent an automaton state.
c    -(-b^{14, 39}_2 ∧  b^{14, 39}_1 ∧  b^{14, 39}_0 ∧ true) 
c  in CNF:
c     b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ false 
c  in DIMACS:
 12380 -12381 -12382  0
c  -3 does not represent an automaton state.
c    -( b^{14, 39}_2 ∧  b^{14, 39}_1 ∧  b^{14, 39}_0 ∧ true) 
c  in CNF:
c    -b^{14, 39}_2 ∨ -b^{14, 39}_1 ∨ -b^{14, 39}_0 ∨ false 
c  in DIMACS:
-12380 -12381 -12382  0

c i = 40
c  -2+1 --> -1
c    ( b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧  p_560) -> ( b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0)
c  in CNF:
c    -b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨  b^{14, 41}_2
c    -b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_1
c    -b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨  b^{14, 41}_0
c  in DIMACS:
-12383 -12384  12385 -560  12386 0
-12383 -12384  12385 -560 -12387 0
-12383 -12384  12385 -560  12388 0

c  -1+1 --> 0
c    ( b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0 ∧  p_560) -> (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧ -b^{14, 41}_0)
c  in CNF:
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_2
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_1
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_0
c  in DIMACS:
-12383  12384 -12385 -560 -12386 0
-12383  12384 -12385 -560 -12387 0
-12383  12384 -12385 -560 -12388 0

c  0+1 --> 1
c    (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧  p_560) -> (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0)
c  in CNF:
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_2
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_1
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨  b^{14, 41}_0
c  in DIMACS:
 12383  12384  12385 -560 -12386 0
 12383  12384  12385 -560 -12387 0
 12383  12384  12385 -560  12388 0

c  1+1 --> 2
c    (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0 ∧  p_560) -> (-b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0)
c  in CNF:
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_2
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨  b^{14, 41}_1
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ -p_560 ∨ -b^{14, 41}_0
c  in DIMACS:
 12383  12384 -12385 -560 -12386 0
 12383  12384 -12385 -560  12387 0
 12383  12384 -12385 -560 -12388 0

c  2+1 --> break 
c    (-b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧  p_560) -> break
c  in CNF:
c     b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 12383 -12384  12385 -560 1162 0


c  2-1 --> 1
c    (-b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧ -p_560) -> (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0)
c  in CNF:
c     b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_2
c     b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_1
c     b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨  b^{14, 41}_0
c  in DIMACS:
 12383 -12384  12385  560 -12386 0
 12383 -12384  12385  560 -12387 0
 12383 -12384  12385  560  12388 0

c  1-1 --> 0
c    (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0 ∧ -p_560) -> (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧ -b^{14, 41}_0)
c  in CNF:
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_2
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_1
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_0
c  in DIMACS:
 12383  12384 -12385  560 -12386 0
 12383  12384 -12385  560 -12387 0
 12383  12384 -12385  560 -12388 0

c  0-1 --> -1
c    (-b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧ -p_560) -> ( b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0)
c  in CNF:
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨  b^{14, 41}_2
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_1
c     b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨  b^{14, 41}_0
c  in DIMACS:
 12383  12384  12385  560  12386 0
 12383  12384  12385  560 -12387 0
 12383  12384  12385  560  12388 0

c  -1-1 --> -2
c    ( b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧  b^{14, 40}_0 ∧ -p_560) -> ( b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0)
c  in CNF:
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨  b^{14, 41}_2
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨  b^{14, 41}_1
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨  p_560 ∨ -b^{14, 41}_0
c  in DIMACS:
-12383  12384 -12385  560  12386 0
-12383  12384 -12385  560  12387 0
-12383  12384 -12385  560 -12388 0

c  -2-1 --> break 
c    ( b^{14, 40}_2 ∧  b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨  b^{14, 40}_0 ∨  p_560 ∨ break
c  in DIMACS:
-12383 -12384  12385  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 40}_2 ∧ -b^{14, 40}_1 ∧ -b^{14, 40}_0 ∧ true) 
c  in CNF:
c    -b^{14, 40}_2 ∨  b^{14, 40}_1 ∨  b^{14, 40}_0 ∨ false 
c  in DIMACS:
-12383  12384  12385  0

c  3 does not represent an automaton state.
c    -(-b^{14, 40}_2 ∧  b^{14, 40}_1 ∧  b^{14, 40}_0 ∧ true) 
c  in CNF:
c     b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ false 
c  in DIMACS:
 12383 -12384 -12385  0
c  -3 does not represent an automaton state.
c    -( b^{14, 40}_2 ∧  b^{14, 40}_1 ∧  b^{14, 40}_0 ∧ true) 
c  in CNF:
c    -b^{14, 40}_2 ∨ -b^{14, 40}_1 ∨ -b^{14, 40}_0 ∨ false 
c  in DIMACS:
-12383 -12384 -12385  0

c i = 41
c  -2+1 --> -1
c    ( b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧  p_574) -> ( b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0)
c  in CNF:
c    -b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨  b^{14, 42}_2
c    -b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_1
c    -b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨  b^{14, 42}_0
c  in DIMACS:
-12386 -12387  12388 -574  12389 0
-12386 -12387  12388 -574 -12390 0
-12386 -12387  12388 -574  12391 0

c  -1+1 --> 0
c    ( b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0 ∧  p_574) -> (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧ -b^{14, 42}_0)
c  in CNF:
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_2
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_1
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_0
c  in DIMACS:
-12386  12387 -12388 -574 -12389 0
-12386  12387 -12388 -574 -12390 0
-12386  12387 -12388 -574 -12391 0

c  0+1 --> 1
c    (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧  p_574) -> (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0)
c  in CNF:
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_2
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_1
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨  b^{14, 42}_0
c  in DIMACS:
 12386  12387  12388 -574 -12389 0
 12386  12387  12388 -574 -12390 0
 12386  12387  12388 -574  12391 0

c  1+1 --> 2
c    (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0 ∧  p_574) -> (-b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0)
c  in CNF:
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_2
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨  b^{14, 42}_1
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ -p_574 ∨ -b^{14, 42}_0
c  in DIMACS:
 12386  12387 -12388 -574 -12389 0
 12386  12387 -12388 -574  12390 0
 12386  12387 -12388 -574 -12391 0

c  2+1 --> break 
c    (-b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧  p_574) -> break
c  in CNF:
c     b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 12386 -12387  12388 -574 1162 0


c  2-1 --> 1
c    (-b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧ -p_574) -> (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0)
c  in CNF:
c     b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_2
c     b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_1
c     b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨  b^{14, 42}_0
c  in DIMACS:
 12386 -12387  12388  574 -12389 0
 12386 -12387  12388  574 -12390 0
 12386 -12387  12388  574  12391 0

c  1-1 --> 0
c    (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0 ∧ -p_574) -> (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧ -b^{14, 42}_0)
c  in CNF:
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_2
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_1
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_0
c  in DIMACS:
 12386  12387 -12388  574 -12389 0
 12386  12387 -12388  574 -12390 0
 12386  12387 -12388  574 -12391 0

c  0-1 --> -1
c    (-b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧ -p_574) -> ( b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0)
c  in CNF:
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨  b^{14, 42}_2
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_1
c     b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨  b^{14, 42}_0
c  in DIMACS:
 12386  12387  12388  574  12389 0
 12386  12387  12388  574 -12390 0
 12386  12387  12388  574  12391 0

c  -1-1 --> -2
c    ( b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧  b^{14, 41}_0 ∧ -p_574) -> ( b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0)
c  in CNF:
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨  b^{14, 42}_2
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨  b^{14, 42}_1
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨  p_574 ∨ -b^{14, 42}_0
c  in DIMACS:
-12386  12387 -12388  574  12389 0
-12386  12387 -12388  574  12390 0
-12386  12387 -12388  574 -12391 0

c  -2-1 --> break 
c    ( b^{14, 41}_2 ∧  b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨  b^{14, 41}_0 ∨  p_574 ∨ break
c  in DIMACS:
-12386 -12387  12388  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 41}_2 ∧ -b^{14, 41}_1 ∧ -b^{14, 41}_0 ∧ true) 
c  in CNF:
c    -b^{14, 41}_2 ∨  b^{14, 41}_1 ∨  b^{14, 41}_0 ∨ false 
c  in DIMACS:
-12386  12387  12388  0

c  3 does not represent an automaton state.
c    -(-b^{14, 41}_2 ∧  b^{14, 41}_1 ∧  b^{14, 41}_0 ∧ true) 
c  in CNF:
c     b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ false 
c  in DIMACS:
 12386 -12387 -12388  0
c  -3 does not represent an automaton state.
c    -( b^{14, 41}_2 ∧  b^{14, 41}_1 ∧  b^{14, 41}_0 ∧ true) 
c  in CNF:
c    -b^{14, 41}_2 ∨ -b^{14, 41}_1 ∨ -b^{14, 41}_0 ∨ false 
c  in DIMACS:
-12386 -12387 -12388  0

c i = 42
c  -2+1 --> -1
c    ( b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧  p_588) -> ( b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0)
c  in CNF:
c    -b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨  b^{14, 43}_2
c    -b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_1
c    -b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨  b^{14, 43}_0
c  in DIMACS:
-12389 -12390  12391 -588  12392 0
-12389 -12390  12391 -588 -12393 0
-12389 -12390  12391 -588  12394 0

c  -1+1 --> 0
c    ( b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0 ∧  p_588) -> (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧ -b^{14, 43}_0)
c  in CNF:
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_2
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_1
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_0
c  in DIMACS:
-12389  12390 -12391 -588 -12392 0
-12389  12390 -12391 -588 -12393 0
-12389  12390 -12391 -588 -12394 0

c  0+1 --> 1
c    (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧  p_588) -> (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0)
c  in CNF:
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_2
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_1
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨  b^{14, 43}_0
c  in DIMACS:
 12389  12390  12391 -588 -12392 0
 12389  12390  12391 -588 -12393 0
 12389  12390  12391 -588  12394 0

c  1+1 --> 2
c    (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0 ∧  p_588) -> (-b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0)
c  in CNF:
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_2
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨  b^{14, 43}_1
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ -p_588 ∨ -b^{14, 43}_0
c  in DIMACS:
 12389  12390 -12391 -588 -12392 0
 12389  12390 -12391 -588  12393 0
 12389  12390 -12391 -588 -12394 0

c  2+1 --> break 
c    (-b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧  p_588) -> break
c  in CNF:
c     b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 12389 -12390  12391 -588 1162 0


c  2-1 --> 1
c    (-b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧ -p_588) -> (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0)
c  in CNF:
c     b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_2
c     b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_1
c     b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨  b^{14, 43}_0
c  in DIMACS:
 12389 -12390  12391  588 -12392 0
 12389 -12390  12391  588 -12393 0
 12389 -12390  12391  588  12394 0

c  1-1 --> 0
c    (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0 ∧ -p_588) -> (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧ -b^{14, 43}_0)
c  in CNF:
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_2
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_1
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_0
c  in DIMACS:
 12389  12390 -12391  588 -12392 0
 12389  12390 -12391  588 -12393 0
 12389  12390 -12391  588 -12394 0

c  0-1 --> -1
c    (-b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧ -p_588) -> ( b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0)
c  in CNF:
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨  b^{14, 43}_2
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_1
c     b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨  b^{14, 43}_0
c  in DIMACS:
 12389  12390  12391  588  12392 0
 12389  12390  12391  588 -12393 0
 12389  12390  12391  588  12394 0

c  -1-1 --> -2
c    ( b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧  b^{14, 42}_0 ∧ -p_588) -> ( b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0)
c  in CNF:
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨  b^{14, 43}_2
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨  b^{14, 43}_1
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨  p_588 ∨ -b^{14, 43}_0
c  in DIMACS:
-12389  12390 -12391  588  12392 0
-12389  12390 -12391  588  12393 0
-12389  12390 -12391  588 -12394 0

c  -2-1 --> break 
c    ( b^{14, 42}_2 ∧  b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨  b^{14, 42}_0 ∨  p_588 ∨ break
c  in DIMACS:
-12389 -12390  12391  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 42}_2 ∧ -b^{14, 42}_1 ∧ -b^{14, 42}_0 ∧ true) 
c  in CNF:
c    -b^{14, 42}_2 ∨  b^{14, 42}_1 ∨  b^{14, 42}_0 ∨ false 
c  in DIMACS:
-12389  12390  12391  0

c  3 does not represent an automaton state.
c    -(-b^{14, 42}_2 ∧  b^{14, 42}_1 ∧  b^{14, 42}_0 ∧ true) 
c  in CNF:
c     b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ false 
c  in DIMACS:
 12389 -12390 -12391  0
c  -3 does not represent an automaton state.
c    -( b^{14, 42}_2 ∧  b^{14, 42}_1 ∧  b^{14, 42}_0 ∧ true) 
c  in CNF:
c    -b^{14, 42}_2 ∨ -b^{14, 42}_1 ∨ -b^{14, 42}_0 ∨ false 
c  in DIMACS:
-12389 -12390 -12391  0

c i = 43
c  -2+1 --> -1
c    ( b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧  p_602) -> ( b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0)
c  in CNF:
c    -b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨  b^{14, 44}_2
c    -b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_1
c    -b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨  b^{14, 44}_0
c  in DIMACS:
-12392 -12393  12394 -602  12395 0
-12392 -12393  12394 -602 -12396 0
-12392 -12393  12394 -602  12397 0

c  -1+1 --> 0
c    ( b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0 ∧  p_602) -> (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧ -b^{14, 44}_0)
c  in CNF:
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_2
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_1
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_0
c  in DIMACS:
-12392  12393 -12394 -602 -12395 0
-12392  12393 -12394 -602 -12396 0
-12392  12393 -12394 -602 -12397 0

c  0+1 --> 1
c    (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧  p_602) -> (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0)
c  in CNF:
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_2
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_1
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨  b^{14, 44}_0
c  in DIMACS:
 12392  12393  12394 -602 -12395 0
 12392  12393  12394 -602 -12396 0
 12392  12393  12394 -602  12397 0

c  1+1 --> 2
c    (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0 ∧  p_602) -> (-b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0)
c  in CNF:
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_2
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨  b^{14, 44}_1
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ -p_602 ∨ -b^{14, 44}_0
c  in DIMACS:
 12392  12393 -12394 -602 -12395 0
 12392  12393 -12394 -602  12396 0
 12392  12393 -12394 -602 -12397 0

c  2+1 --> break 
c    (-b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧  p_602) -> break
c  in CNF:
c     b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 12392 -12393  12394 -602 1162 0


c  2-1 --> 1
c    (-b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧ -p_602) -> (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0)
c  in CNF:
c     b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_2
c     b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_1
c     b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨  b^{14, 44}_0
c  in DIMACS:
 12392 -12393  12394  602 -12395 0
 12392 -12393  12394  602 -12396 0
 12392 -12393  12394  602  12397 0

c  1-1 --> 0
c    (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0 ∧ -p_602) -> (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧ -b^{14, 44}_0)
c  in CNF:
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_2
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_1
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_0
c  in DIMACS:
 12392  12393 -12394  602 -12395 0
 12392  12393 -12394  602 -12396 0
 12392  12393 -12394  602 -12397 0

c  0-1 --> -1
c    (-b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧ -p_602) -> ( b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0)
c  in CNF:
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨  b^{14, 44}_2
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_1
c     b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨  b^{14, 44}_0
c  in DIMACS:
 12392  12393  12394  602  12395 0
 12392  12393  12394  602 -12396 0
 12392  12393  12394  602  12397 0

c  -1-1 --> -2
c    ( b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧  b^{14, 43}_0 ∧ -p_602) -> ( b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0)
c  in CNF:
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨  b^{14, 44}_2
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨  b^{14, 44}_1
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨  p_602 ∨ -b^{14, 44}_0
c  in DIMACS:
-12392  12393 -12394  602  12395 0
-12392  12393 -12394  602  12396 0
-12392  12393 -12394  602 -12397 0

c  -2-1 --> break 
c    ( b^{14, 43}_2 ∧  b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨  b^{14, 43}_0 ∨  p_602 ∨ break
c  in DIMACS:
-12392 -12393  12394  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 43}_2 ∧ -b^{14, 43}_1 ∧ -b^{14, 43}_0 ∧ true) 
c  in CNF:
c    -b^{14, 43}_2 ∨  b^{14, 43}_1 ∨  b^{14, 43}_0 ∨ false 
c  in DIMACS:
-12392  12393  12394  0

c  3 does not represent an automaton state.
c    -(-b^{14, 43}_2 ∧  b^{14, 43}_1 ∧  b^{14, 43}_0 ∧ true) 
c  in CNF:
c     b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ false 
c  in DIMACS:
 12392 -12393 -12394  0
c  -3 does not represent an automaton state.
c    -( b^{14, 43}_2 ∧  b^{14, 43}_1 ∧  b^{14, 43}_0 ∧ true) 
c  in CNF:
c    -b^{14, 43}_2 ∨ -b^{14, 43}_1 ∨ -b^{14, 43}_0 ∨ false 
c  in DIMACS:
-12392 -12393 -12394  0

c i = 44
c  -2+1 --> -1
c    ( b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧  p_616) -> ( b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0)
c  in CNF:
c    -b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨  b^{14, 45}_2
c    -b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_1
c    -b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨  b^{14, 45}_0
c  in DIMACS:
-12395 -12396  12397 -616  12398 0
-12395 -12396  12397 -616 -12399 0
-12395 -12396  12397 -616  12400 0

c  -1+1 --> 0
c    ( b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0 ∧  p_616) -> (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧ -b^{14, 45}_0)
c  in CNF:
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_2
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_1
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_0
c  in DIMACS:
-12395  12396 -12397 -616 -12398 0
-12395  12396 -12397 -616 -12399 0
-12395  12396 -12397 -616 -12400 0

c  0+1 --> 1
c    (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧  p_616) -> (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0)
c  in CNF:
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_2
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_1
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨  b^{14, 45}_0
c  in DIMACS:
 12395  12396  12397 -616 -12398 0
 12395  12396  12397 -616 -12399 0
 12395  12396  12397 -616  12400 0

c  1+1 --> 2
c    (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0 ∧  p_616) -> (-b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0)
c  in CNF:
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_2
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨  b^{14, 45}_1
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ -p_616 ∨ -b^{14, 45}_0
c  in DIMACS:
 12395  12396 -12397 -616 -12398 0
 12395  12396 -12397 -616  12399 0
 12395  12396 -12397 -616 -12400 0

c  2+1 --> break 
c    (-b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧  p_616) -> break
c  in CNF:
c     b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 12395 -12396  12397 -616 1162 0


c  2-1 --> 1
c    (-b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧ -p_616) -> (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0)
c  in CNF:
c     b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_2
c     b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_1
c     b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨  b^{14, 45}_0
c  in DIMACS:
 12395 -12396  12397  616 -12398 0
 12395 -12396  12397  616 -12399 0
 12395 -12396  12397  616  12400 0

c  1-1 --> 0
c    (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0 ∧ -p_616) -> (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧ -b^{14, 45}_0)
c  in CNF:
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_2
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_1
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_0
c  in DIMACS:
 12395  12396 -12397  616 -12398 0
 12395  12396 -12397  616 -12399 0
 12395  12396 -12397  616 -12400 0

c  0-1 --> -1
c    (-b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧ -p_616) -> ( b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0)
c  in CNF:
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨  b^{14, 45}_2
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_1
c     b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨  b^{14, 45}_0
c  in DIMACS:
 12395  12396  12397  616  12398 0
 12395  12396  12397  616 -12399 0
 12395  12396  12397  616  12400 0

c  -1-1 --> -2
c    ( b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧  b^{14, 44}_0 ∧ -p_616) -> ( b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0)
c  in CNF:
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨  b^{14, 45}_2
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨  b^{14, 45}_1
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨  p_616 ∨ -b^{14, 45}_0
c  in DIMACS:
-12395  12396 -12397  616  12398 0
-12395  12396 -12397  616  12399 0
-12395  12396 -12397  616 -12400 0

c  -2-1 --> break 
c    ( b^{14, 44}_2 ∧  b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨  b^{14, 44}_0 ∨  p_616 ∨ break
c  in DIMACS:
-12395 -12396  12397  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 44}_2 ∧ -b^{14, 44}_1 ∧ -b^{14, 44}_0 ∧ true) 
c  in CNF:
c    -b^{14, 44}_2 ∨  b^{14, 44}_1 ∨  b^{14, 44}_0 ∨ false 
c  in DIMACS:
-12395  12396  12397  0

c  3 does not represent an automaton state.
c    -(-b^{14, 44}_2 ∧  b^{14, 44}_1 ∧  b^{14, 44}_0 ∧ true) 
c  in CNF:
c     b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ false 
c  in DIMACS:
 12395 -12396 -12397  0
c  -3 does not represent an automaton state.
c    -( b^{14, 44}_2 ∧  b^{14, 44}_1 ∧  b^{14, 44}_0 ∧ true) 
c  in CNF:
c    -b^{14, 44}_2 ∨ -b^{14, 44}_1 ∨ -b^{14, 44}_0 ∨ false 
c  in DIMACS:
-12395 -12396 -12397  0

c i = 45
c  -2+1 --> -1
c    ( b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧  p_630) -> ( b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0)
c  in CNF:
c    -b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨  b^{14, 46}_2
c    -b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_1
c    -b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨  b^{14, 46}_0
c  in DIMACS:
-12398 -12399  12400 -630  12401 0
-12398 -12399  12400 -630 -12402 0
-12398 -12399  12400 -630  12403 0

c  -1+1 --> 0
c    ( b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0 ∧  p_630) -> (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧ -b^{14, 46}_0)
c  in CNF:
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_2
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_1
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_0
c  in DIMACS:
-12398  12399 -12400 -630 -12401 0
-12398  12399 -12400 -630 -12402 0
-12398  12399 -12400 -630 -12403 0

c  0+1 --> 1
c    (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧  p_630) -> (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0)
c  in CNF:
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_2
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_1
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨  b^{14, 46}_0
c  in DIMACS:
 12398  12399  12400 -630 -12401 0
 12398  12399  12400 -630 -12402 0
 12398  12399  12400 -630  12403 0

c  1+1 --> 2
c    (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0 ∧  p_630) -> (-b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0)
c  in CNF:
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_2
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨  b^{14, 46}_1
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ -p_630 ∨ -b^{14, 46}_0
c  in DIMACS:
 12398  12399 -12400 -630 -12401 0
 12398  12399 -12400 -630  12402 0
 12398  12399 -12400 -630 -12403 0

c  2+1 --> break 
c    (-b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧  p_630) -> break
c  in CNF:
c     b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 12398 -12399  12400 -630 1162 0


c  2-1 --> 1
c    (-b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧ -p_630) -> (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0)
c  in CNF:
c     b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_2
c     b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_1
c     b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨  b^{14, 46}_0
c  in DIMACS:
 12398 -12399  12400  630 -12401 0
 12398 -12399  12400  630 -12402 0
 12398 -12399  12400  630  12403 0

c  1-1 --> 0
c    (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0 ∧ -p_630) -> (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧ -b^{14, 46}_0)
c  in CNF:
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_2
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_1
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_0
c  in DIMACS:
 12398  12399 -12400  630 -12401 0
 12398  12399 -12400  630 -12402 0
 12398  12399 -12400  630 -12403 0

c  0-1 --> -1
c    (-b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧ -p_630) -> ( b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0)
c  in CNF:
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨  b^{14, 46}_2
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_1
c     b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨  b^{14, 46}_0
c  in DIMACS:
 12398  12399  12400  630  12401 0
 12398  12399  12400  630 -12402 0
 12398  12399  12400  630  12403 0

c  -1-1 --> -2
c    ( b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧  b^{14, 45}_0 ∧ -p_630) -> ( b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0)
c  in CNF:
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨  b^{14, 46}_2
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨  b^{14, 46}_1
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨  p_630 ∨ -b^{14, 46}_0
c  in DIMACS:
-12398  12399 -12400  630  12401 0
-12398  12399 -12400  630  12402 0
-12398  12399 -12400  630 -12403 0

c  -2-1 --> break 
c    ( b^{14, 45}_2 ∧  b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨  b^{14, 45}_0 ∨  p_630 ∨ break
c  in DIMACS:
-12398 -12399  12400  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 45}_2 ∧ -b^{14, 45}_1 ∧ -b^{14, 45}_0 ∧ true) 
c  in CNF:
c    -b^{14, 45}_2 ∨  b^{14, 45}_1 ∨  b^{14, 45}_0 ∨ false 
c  in DIMACS:
-12398  12399  12400  0

c  3 does not represent an automaton state.
c    -(-b^{14, 45}_2 ∧  b^{14, 45}_1 ∧  b^{14, 45}_0 ∧ true) 
c  in CNF:
c     b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ false 
c  in DIMACS:
 12398 -12399 -12400  0
c  -3 does not represent an automaton state.
c    -( b^{14, 45}_2 ∧  b^{14, 45}_1 ∧  b^{14, 45}_0 ∧ true) 
c  in CNF:
c    -b^{14, 45}_2 ∨ -b^{14, 45}_1 ∨ -b^{14, 45}_0 ∨ false 
c  in DIMACS:
-12398 -12399 -12400  0

c i = 46
c  -2+1 --> -1
c    ( b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧  p_644) -> ( b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0)
c  in CNF:
c    -b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨  b^{14, 47}_2
c    -b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_1
c    -b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨  b^{14, 47}_0
c  in DIMACS:
-12401 -12402  12403 -644  12404 0
-12401 -12402  12403 -644 -12405 0
-12401 -12402  12403 -644  12406 0

c  -1+1 --> 0
c    ( b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0 ∧  p_644) -> (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧ -b^{14, 47}_0)
c  in CNF:
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_2
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_1
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_0
c  in DIMACS:
-12401  12402 -12403 -644 -12404 0
-12401  12402 -12403 -644 -12405 0
-12401  12402 -12403 -644 -12406 0

c  0+1 --> 1
c    (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧  p_644) -> (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0)
c  in CNF:
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_2
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_1
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨  b^{14, 47}_0
c  in DIMACS:
 12401  12402  12403 -644 -12404 0
 12401  12402  12403 -644 -12405 0
 12401  12402  12403 -644  12406 0

c  1+1 --> 2
c    (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0 ∧  p_644) -> (-b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0)
c  in CNF:
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_2
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨  b^{14, 47}_1
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ -p_644 ∨ -b^{14, 47}_0
c  in DIMACS:
 12401  12402 -12403 -644 -12404 0
 12401  12402 -12403 -644  12405 0
 12401  12402 -12403 -644 -12406 0

c  2+1 --> break 
c    (-b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧  p_644) -> break
c  in CNF:
c     b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 12401 -12402  12403 -644 1162 0


c  2-1 --> 1
c    (-b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧ -p_644) -> (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0)
c  in CNF:
c     b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_2
c     b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_1
c     b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨  b^{14, 47}_0
c  in DIMACS:
 12401 -12402  12403  644 -12404 0
 12401 -12402  12403  644 -12405 0
 12401 -12402  12403  644  12406 0

c  1-1 --> 0
c    (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0 ∧ -p_644) -> (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧ -b^{14, 47}_0)
c  in CNF:
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_2
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_1
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_0
c  in DIMACS:
 12401  12402 -12403  644 -12404 0
 12401  12402 -12403  644 -12405 0
 12401  12402 -12403  644 -12406 0

c  0-1 --> -1
c    (-b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧ -p_644) -> ( b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0)
c  in CNF:
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨  b^{14, 47}_2
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_1
c     b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨  b^{14, 47}_0
c  in DIMACS:
 12401  12402  12403  644  12404 0
 12401  12402  12403  644 -12405 0
 12401  12402  12403  644  12406 0

c  -1-1 --> -2
c    ( b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧  b^{14, 46}_0 ∧ -p_644) -> ( b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0)
c  in CNF:
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨  b^{14, 47}_2
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨  b^{14, 47}_1
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨  p_644 ∨ -b^{14, 47}_0
c  in DIMACS:
-12401  12402 -12403  644  12404 0
-12401  12402 -12403  644  12405 0
-12401  12402 -12403  644 -12406 0

c  -2-1 --> break 
c    ( b^{14, 46}_2 ∧  b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨  b^{14, 46}_0 ∨  p_644 ∨ break
c  in DIMACS:
-12401 -12402  12403  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 46}_2 ∧ -b^{14, 46}_1 ∧ -b^{14, 46}_0 ∧ true) 
c  in CNF:
c    -b^{14, 46}_2 ∨  b^{14, 46}_1 ∨  b^{14, 46}_0 ∨ false 
c  in DIMACS:
-12401  12402  12403  0

c  3 does not represent an automaton state.
c    -(-b^{14, 46}_2 ∧  b^{14, 46}_1 ∧  b^{14, 46}_0 ∧ true) 
c  in CNF:
c     b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ false 
c  in DIMACS:
 12401 -12402 -12403  0
c  -3 does not represent an automaton state.
c    -( b^{14, 46}_2 ∧  b^{14, 46}_1 ∧  b^{14, 46}_0 ∧ true) 
c  in CNF:
c    -b^{14, 46}_2 ∨ -b^{14, 46}_1 ∨ -b^{14, 46}_0 ∨ false 
c  in DIMACS:
-12401 -12402 -12403  0

c i = 47
c  -2+1 --> -1
c    ( b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧  p_658) -> ( b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0)
c  in CNF:
c    -b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨  b^{14, 48}_2
c    -b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_1
c    -b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨  b^{14, 48}_0
c  in DIMACS:
-12404 -12405  12406 -658  12407 0
-12404 -12405  12406 -658 -12408 0
-12404 -12405  12406 -658  12409 0

c  -1+1 --> 0
c    ( b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0 ∧  p_658) -> (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧ -b^{14, 48}_0)
c  in CNF:
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_2
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_1
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_0
c  in DIMACS:
-12404  12405 -12406 -658 -12407 0
-12404  12405 -12406 -658 -12408 0
-12404  12405 -12406 -658 -12409 0

c  0+1 --> 1
c    (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧  p_658) -> (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0)
c  in CNF:
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_2
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_1
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨  b^{14, 48}_0
c  in DIMACS:
 12404  12405  12406 -658 -12407 0
 12404  12405  12406 -658 -12408 0
 12404  12405  12406 -658  12409 0

c  1+1 --> 2
c    (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0 ∧  p_658) -> (-b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0)
c  in CNF:
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_2
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨  b^{14, 48}_1
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ -p_658 ∨ -b^{14, 48}_0
c  in DIMACS:
 12404  12405 -12406 -658 -12407 0
 12404  12405 -12406 -658  12408 0
 12404  12405 -12406 -658 -12409 0

c  2+1 --> break 
c    (-b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧  p_658) -> break
c  in CNF:
c     b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 12404 -12405  12406 -658 1162 0


c  2-1 --> 1
c    (-b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧ -p_658) -> (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0)
c  in CNF:
c     b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_2
c     b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_1
c     b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨  b^{14, 48}_0
c  in DIMACS:
 12404 -12405  12406  658 -12407 0
 12404 -12405  12406  658 -12408 0
 12404 -12405  12406  658  12409 0

c  1-1 --> 0
c    (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0 ∧ -p_658) -> (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧ -b^{14, 48}_0)
c  in CNF:
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_2
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_1
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_0
c  in DIMACS:
 12404  12405 -12406  658 -12407 0
 12404  12405 -12406  658 -12408 0
 12404  12405 -12406  658 -12409 0

c  0-1 --> -1
c    (-b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧ -p_658) -> ( b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0)
c  in CNF:
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨  b^{14, 48}_2
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_1
c     b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨  b^{14, 48}_0
c  in DIMACS:
 12404  12405  12406  658  12407 0
 12404  12405  12406  658 -12408 0
 12404  12405  12406  658  12409 0

c  -1-1 --> -2
c    ( b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧  b^{14, 47}_0 ∧ -p_658) -> ( b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0)
c  in CNF:
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨  b^{14, 48}_2
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨  b^{14, 48}_1
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨  p_658 ∨ -b^{14, 48}_0
c  in DIMACS:
-12404  12405 -12406  658  12407 0
-12404  12405 -12406  658  12408 0
-12404  12405 -12406  658 -12409 0

c  -2-1 --> break 
c    ( b^{14, 47}_2 ∧  b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨  b^{14, 47}_0 ∨  p_658 ∨ break
c  in DIMACS:
-12404 -12405  12406  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 47}_2 ∧ -b^{14, 47}_1 ∧ -b^{14, 47}_0 ∧ true) 
c  in CNF:
c    -b^{14, 47}_2 ∨  b^{14, 47}_1 ∨  b^{14, 47}_0 ∨ false 
c  in DIMACS:
-12404  12405  12406  0

c  3 does not represent an automaton state.
c    -(-b^{14, 47}_2 ∧  b^{14, 47}_1 ∧  b^{14, 47}_0 ∧ true) 
c  in CNF:
c     b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ false 
c  in DIMACS:
 12404 -12405 -12406  0
c  -3 does not represent an automaton state.
c    -( b^{14, 47}_2 ∧  b^{14, 47}_1 ∧  b^{14, 47}_0 ∧ true) 
c  in CNF:
c    -b^{14, 47}_2 ∨ -b^{14, 47}_1 ∨ -b^{14, 47}_0 ∨ false 
c  in DIMACS:
-12404 -12405 -12406  0

c i = 48
c  -2+1 --> -1
c    ( b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧  p_672) -> ( b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0)
c  in CNF:
c    -b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨  b^{14, 49}_2
c    -b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_1
c    -b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨  b^{14, 49}_0
c  in DIMACS:
-12407 -12408  12409 -672  12410 0
-12407 -12408  12409 -672 -12411 0
-12407 -12408  12409 -672  12412 0

c  -1+1 --> 0
c    ( b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0 ∧  p_672) -> (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧ -b^{14, 49}_0)
c  in CNF:
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_2
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_1
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_0
c  in DIMACS:
-12407  12408 -12409 -672 -12410 0
-12407  12408 -12409 -672 -12411 0
-12407  12408 -12409 -672 -12412 0

c  0+1 --> 1
c    (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧  p_672) -> (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0)
c  in CNF:
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_2
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_1
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨  b^{14, 49}_0
c  in DIMACS:
 12407  12408  12409 -672 -12410 0
 12407  12408  12409 -672 -12411 0
 12407  12408  12409 -672  12412 0

c  1+1 --> 2
c    (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0 ∧  p_672) -> (-b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0)
c  in CNF:
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_2
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨  b^{14, 49}_1
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ -p_672 ∨ -b^{14, 49}_0
c  in DIMACS:
 12407  12408 -12409 -672 -12410 0
 12407  12408 -12409 -672  12411 0
 12407  12408 -12409 -672 -12412 0

c  2+1 --> break 
c    (-b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧  p_672) -> break
c  in CNF:
c     b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 12407 -12408  12409 -672 1162 0


c  2-1 --> 1
c    (-b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧ -p_672) -> (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0)
c  in CNF:
c     b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_2
c     b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_1
c     b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨  b^{14, 49}_0
c  in DIMACS:
 12407 -12408  12409  672 -12410 0
 12407 -12408  12409  672 -12411 0
 12407 -12408  12409  672  12412 0

c  1-1 --> 0
c    (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0 ∧ -p_672) -> (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧ -b^{14, 49}_0)
c  in CNF:
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_2
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_1
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_0
c  in DIMACS:
 12407  12408 -12409  672 -12410 0
 12407  12408 -12409  672 -12411 0
 12407  12408 -12409  672 -12412 0

c  0-1 --> -1
c    (-b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧ -p_672) -> ( b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0)
c  in CNF:
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨  b^{14, 49}_2
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_1
c     b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨  b^{14, 49}_0
c  in DIMACS:
 12407  12408  12409  672  12410 0
 12407  12408  12409  672 -12411 0
 12407  12408  12409  672  12412 0

c  -1-1 --> -2
c    ( b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧  b^{14, 48}_0 ∧ -p_672) -> ( b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0)
c  in CNF:
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨  b^{14, 49}_2
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨  b^{14, 49}_1
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨  p_672 ∨ -b^{14, 49}_0
c  in DIMACS:
-12407  12408 -12409  672  12410 0
-12407  12408 -12409  672  12411 0
-12407  12408 -12409  672 -12412 0

c  -2-1 --> break 
c    ( b^{14, 48}_2 ∧  b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨  b^{14, 48}_0 ∨  p_672 ∨ break
c  in DIMACS:
-12407 -12408  12409  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 48}_2 ∧ -b^{14, 48}_1 ∧ -b^{14, 48}_0 ∧ true) 
c  in CNF:
c    -b^{14, 48}_2 ∨  b^{14, 48}_1 ∨  b^{14, 48}_0 ∨ false 
c  in DIMACS:
-12407  12408  12409  0

c  3 does not represent an automaton state.
c    -(-b^{14, 48}_2 ∧  b^{14, 48}_1 ∧  b^{14, 48}_0 ∧ true) 
c  in CNF:
c     b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ false 
c  in DIMACS:
 12407 -12408 -12409  0
c  -3 does not represent an automaton state.
c    -( b^{14, 48}_2 ∧  b^{14, 48}_1 ∧  b^{14, 48}_0 ∧ true) 
c  in CNF:
c    -b^{14, 48}_2 ∨ -b^{14, 48}_1 ∨ -b^{14, 48}_0 ∨ false 
c  in DIMACS:
-12407 -12408 -12409  0

c i = 49
c  -2+1 --> -1
c    ( b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧  p_686) -> ( b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0)
c  in CNF:
c    -b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨  b^{14, 50}_2
c    -b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_1
c    -b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨  b^{14, 50}_0
c  in DIMACS:
-12410 -12411  12412 -686  12413 0
-12410 -12411  12412 -686 -12414 0
-12410 -12411  12412 -686  12415 0

c  -1+1 --> 0
c    ( b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0 ∧  p_686) -> (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧ -b^{14, 50}_0)
c  in CNF:
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_2
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_1
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_0
c  in DIMACS:
-12410  12411 -12412 -686 -12413 0
-12410  12411 -12412 -686 -12414 0
-12410  12411 -12412 -686 -12415 0

c  0+1 --> 1
c    (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧  p_686) -> (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0)
c  in CNF:
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_2
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_1
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨  b^{14, 50}_0
c  in DIMACS:
 12410  12411  12412 -686 -12413 0
 12410  12411  12412 -686 -12414 0
 12410  12411  12412 -686  12415 0

c  1+1 --> 2
c    (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0 ∧  p_686) -> (-b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0)
c  in CNF:
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_2
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨  b^{14, 50}_1
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ -p_686 ∨ -b^{14, 50}_0
c  in DIMACS:
 12410  12411 -12412 -686 -12413 0
 12410  12411 -12412 -686  12414 0
 12410  12411 -12412 -686 -12415 0

c  2+1 --> break 
c    (-b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧  p_686) -> break
c  in CNF:
c     b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 12410 -12411  12412 -686 1162 0


c  2-1 --> 1
c    (-b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧ -p_686) -> (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0)
c  in CNF:
c     b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_2
c     b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_1
c     b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨  b^{14, 50}_0
c  in DIMACS:
 12410 -12411  12412  686 -12413 0
 12410 -12411  12412  686 -12414 0
 12410 -12411  12412  686  12415 0

c  1-1 --> 0
c    (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0 ∧ -p_686) -> (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧ -b^{14, 50}_0)
c  in CNF:
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_2
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_1
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_0
c  in DIMACS:
 12410  12411 -12412  686 -12413 0
 12410  12411 -12412  686 -12414 0
 12410  12411 -12412  686 -12415 0

c  0-1 --> -1
c    (-b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧ -p_686) -> ( b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0)
c  in CNF:
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨  b^{14, 50}_2
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_1
c     b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨  b^{14, 50}_0
c  in DIMACS:
 12410  12411  12412  686  12413 0
 12410  12411  12412  686 -12414 0
 12410  12411  12412  686  12415 0

c  -1-1 --> -2
c    ( b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧  b^{14, 49}_0 ∧ -p_686) -> ( b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0)
c  in CNF:
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨  b^{14, 50}_2
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨  b^{14, 50}_1
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨  p_686 ∨ -b^{14, 50}_0
c  in DIMACS:
-12410  12411 -12412  686  12413 0
-12410  12411 -12412  686  12414 0
-12410  12411 -12412  686 -12415 0

c  -2-1 --> break 
c    ( b^{14, 49}_2 ∧  b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨  b^{14, 49}_0 ∨  p_686 ∨ break
c  in DIMACS:
-12410 -12411  12412  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 49}_2 ∧ -b^{14, 49}_1 ∧ -b^{14, 49}_0 ∧ true) 
c  in CNF:
c    -b^{14, 49}_2 ∨  b^{14, 49}_1 ∨  b^{14, 49}_0 ∨ false 
c  in DIMACS:
-12410  12411  12412  0

c  3 does not represent an automaton state.
c    -(-b^{14, 49}_2 ∧  b^{14, 49}_1 ∧  b^{14, 49}_0 ∧ true) 
c  in CNF:
c     b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ false 
c  in DIMACS:
 12410 -12411 -12412  0
c  -3 does not represent an automaton state.
c    -( b^{14, 49}_2 ∧  b^{14, 49}_1 ∧  b^{14, 49}_0 ∧ true) 
c  in CNF:
c    -b^{14, 49}_2 ∨ -b^{14, 49}_1 ∨ -b^{14, 49}_0 ∨ false 
c  in DIMACS:
-12410 -12411 -12412  0

c i = 50
c  -2+1 --> -1
c    ( b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧  p_700) -> ( b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0)
c  in CNF:
c    -b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨  b^{14, 51}_2
c    -b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_1
c    -b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨  b^{14, 51}_0
c  in DIMACS:
-12413 -12414  12415 -700  12416 0
-12413 -12414  12415 -700 -12417 0
-12413 -12414  12415 -700  12418 0

c  -1+1 --> 0
c    ( b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0 ∧  p_700) -> (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧ -b^{14, 51}_0)
c  in CNF:
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_2
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_1
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_0
c  in DIMACS:
-12413  12414 -12415 -700 -12416 0
-12413  12414 -12415 -700 -12417 0
-12413  12414 -12415 -700 -12418 0

c  0+1 --> 1
c    (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧  p_700) -> (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0)
c  in CNF:
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_2
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_1
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨  b^{14, 51}_0
c  in DIMACS:
 12413  12414  12415 -700 -12416 0
 12413  12414  12415 -700 -12417 0
 12413  12414  12415 -700  12418 0

c  1+1 --> 2
c    (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0 ∧  p_700) -> (-b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0)
c  in CNF:
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_2
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨  b^{14, 51}_1
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ -p_700 ∨ -b^{14, 51}_0
c  in DIMACS:
 12413  12414 -12415 -700 -12416 0
 12413  12414 -12415 -700  12417 0
 12413  12414 -12415 -700 -12418 0

c  2+1 --> break 
c    (-b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧  p_700) -> break
c  in CNF:
c     b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 12413 -12414  12415 -700 1162 0


c  2-1 --> 1
c    (-b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧ -p_700) -> (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0)
c  in CNF:
c     b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_2
c     b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_1
c     b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨  b^{14, 51}_0
c  in DIMACS:
 12413 -12414  12415  700 -12416 0
 12413 -12414  12415  700 -12417 0
 12413 -12414  12415  700  12418 0

c  1-1 --> 0
c    (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0 ∧ -p_700) -> (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧ -b^{14, 51}_0)
c  in CNF:
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_2
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_1
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_0
c  in DIMACS:
 12413  12414 -12415  700 -12416 0
 12413  12414 -12415  700 -12417 0
 12413  12414 -12415  700 -12418 0

c  0-1 --> -1
c    (-b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧ -p_700) -> ( b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0)
c  in CNF:
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨  b^{14, 51}_2
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_1
c     b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨  b^{14, 51}_0
c  in DIMACS:
 12413  12414  12415  700  12416 0
 12413  12414  12415  700 -12417 0
 12413  12414  12415  700  12418 0

c  -1-1 --> -2
c    ( b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧  b^{14, 50}_0 ∧ -p_700) -> ( b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0)
c  in CNF:
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨  b^{14, 51}_2
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨  b^{14, 51}_1
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨  p_700 ∨ -b^{14, 51}_0
c  in DIMACS:
-12413  12414 -12415  700  12416 0
-12413  12414 -12415  700  12417 0
-12413  12414 -12415  700 -12418 0

c  -2-1 --> break 
c    ( b^{14, 50}_2 ∧  b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨  b^{14, 50}_0 ∨  p_700 ∨ break
c  in DIMACS:
-12413 -12414  12415  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 50}_2 ∧ -b^{14, 50}_1 ∧ -b^{14, 50}_0 ∧ true) 
c  in CNF:
c    -b^{14, 50}_2 ∨  b^{14, 50}_1 ∨  b^{14, 50}_0 ∨ false 
c  in DIMACS:
-12413  12414  12415  0

c  3 does not represent an automaton state.
c    -(-b^{14, 50}_2 ∧  b^{14, 50}_1 ∧  b^{14, 50}_0 ∧ true) 
c  in CNF:
c     b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ false 
c  in DIMACS:
 12413 -12414 -12415  0
c  -3 does not represent an automaton state.
c    -( b^{14, 50}_2 ∧  b^{14, 50}_1 ∧  b^{14, 50}_0 ∧ true) 
c  in CNF:
c    -b^{14, 50}_2 ∨ -b^{14, 50}_1 ∨ -b^{14, 50}_0 ∨ false 
c  in DIMACS:
-12413 -12414 -12415  0

c i = 51
c  -2+1 --> -1
c    ( b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧  p_714) -> ( b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0)
c  in CNF:
c    -b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨  b^{14, 52}_2
c    -b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_1
c    -b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨  b^{14, 52}_0
c  in DIMACS:
-12416 -12417  12418 -714  12419 0
-12416 -12417  12418 -714 -12420 0
-12416 -12417  12418 -714  12421 0

c  -1+1 --> 0
c    ( b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0 ∧  p_714) -> (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧ -b^{14, 52}_0)
c  in CNF:
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_2
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_1
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_0
c  in DIMACS:
-12416  12417 -12418 -714 -12419 0
-12416  12417 -12418 -714 -12420 0
-12416  12417 -12418 -714 -12421 0

c  0+1 --> 1
c    (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧  p_714) -> (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0)
c  in CNF:
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_2
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_1
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨  b^{14, 52}_0
c  in DIMACS:
 12416  12417  12418 -714 -12419 0
 12416  12417  12418 -714 -12420 0
 12416  12417  12418 -714  12421 0

c  1+1 --> 2
c    (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0 ∧  p_714) -> (-b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0)
c  in CNF:
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_2
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨  b^{14, 52}_1
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ -p_714 ∨ -b^{14, 52}_0
c  in DIMACS:
 12416  12417 -12418 -714 -12419 0
 12416  12417 -12418 -714  12420 0
 12416  12417 -12418 -714 -12421 0

c  2+1 --> break 
c    (-b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧  p_714) -> break
c  in CNF:
c     b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 12416 -12417  12418 -714 1162 0


c  2-1 --> 1
c    (-b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧ -p_714) -> (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0)
c  in CNF:
c     b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_2
c     b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_1
c     b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨  b^{14, 52}_0
c  in DIMACS:
 12416 -12417  12418  714 -12419 0
 12416 -12417  12418  714 -12420 0
 12416 -12417  12418  714  12421 0

c  1-1 --> 0
c    (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0 ∧ -p_714) -> (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧ -b^{14, 52}_0)
c  in CNF:
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_2
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_1
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_0
c  in DIMACS:
 12416  12417 -12418  714 -12419 0
 12416  12417 -12418  714 -12420 0
 12416  12417 -12418  714 -12421 0

c  0-1 --> -1
c    (-b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧ -p_714) -> ( b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0)
c  in CNF:
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨  b^{14, 52}_2
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_1
c     b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨  b^{14, 52}_0
c  in DIMACS:
 12416  12417  12418  714  12419 0
 12416  12417  12418  714 -12420 0
 12416  12417  12418  714  12421 0

c  -1-1 --> -2
c    ( b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧  b^{14, 51}_0 ∧ -p_714) -> ( b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0)
c  in CNF:
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨  b^{14, 52}_2
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨  b^{14, 52}_1
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨  p_714 ∨ -b^{14, 52}_0
c  in DIMACS:
-12416  12417 -12418  714  12419 0
-12416  12417 -12418  714  12420 0
-12416  12417 -12418  714 -12421 0

c  -2-1 --> break 
c    ( b^{14, 51}_2 ∧  b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨  b^{14, 51}_0 ∨  p_714 ∨ break
c  in DIMACS:
-12416 -12417  12418  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 51}_2 ∧ -b^{14, 51}_1 ∧ -b^{14, 51}_0 ∧ true) 
c  in CNF:
c    -b^{14, 51}_2 ∨  b^{14, 51}_1 ∨  b^{14, 51}_0 ∨ false 
c  in DIMACS:
-12416  12417  12418  0

c  3 does not represent an automaton state.
c    -(-b^{14, 51}_2 ∧  b^{14, 51}_1 ∧  b^{14, 51}_0 ∧ true) 
c  in CNF:
c     b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ false 
c  in DIMACS:
 12416 -12417 -12418  0
c  -3 does not represent an automaton state.
c    -( b^{14, 51}_2 ∧  b^{14, 51}_1 ∧  b^{14, 51}_0 ∧ true) 
c  in CNF:
c    -b^{14, 51}_2 ∨ -b^{14, 51}_1 ∨ -b^{14, 51}_0 ∨ false 
c  in DIMACS:
-12416 -12417 -12418  0

c i = 52
c  -2+1 --> -1
c    ( b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧  p_728) -> ( b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0)
c  in CNF:
c    -b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨  b^{14, 53}_2
c    -b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_1
c    -b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨  b^{14, 53}_0
c  in DIMACS:
-12419 -12420  12421 -728  12422 0
-12419 -12420  12421 -728 -12423 0
-12419 -12420  12421 -728  12424 0

c  -1+1 --> 0
c    ( b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0 ∧  p_728) -> (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧ -b^{14, 53}_0)
c  in CNF:
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_2
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_1
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_0
c  in DIMACS:
-12419  12420 -12421 -728 -12422 0
-12419  12420 -12421 -728 -12423 0
-12419  12420 -12421 -728 -12424 0

c  0+1 --> 1
c    (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧  p_728) -> (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0)
c  in CNF:
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_2
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_1
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨  b^{14, 53}_0
c  in DIMACS:
 12419  12420  12421 -728 -12422 0
 12419  12420  12421 -728 -12423 0
 12419  12420  12421 -728  12424 0

c  1+1 --> 2
c    (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0 ∧  p_728) -> (-b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0)
c  in CNF:
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_2
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨  b^{14, 53}_1
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ -p_728 ∨ -b^{14, 53}_0
c  in DIMACS:
 12419  12420 -12421 -728 -12422 0
 12419  12420 -12421 -728  12423 0
 12419  12420 -12421 -728 -12424 0

c  2+1 --> break 
c    (-b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧  p_728) -> break
c  in CNF:
c     b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 12419 -12420  12421 -728 1162 0


c  2-1 --> 1
c    (-b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧ -p_728) -> (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0)
c  in CNF:
c     b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_2
c     b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_1
c     b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨  b^{14, 53}_0
c  in DIMACS:
 12419 -12420  12421  728 -12422 0
 12419 -12420  12421  728 -12423 0
 12419 -12420  12421  728  12424 0

c  1-1 --> 0
c    (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0 ∧ -p_728) -> (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧ -b^{14, 53}_0)
c  in CNF:
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_2
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_1
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_0
c  in DIMACS:
 12419  12420 -12421  728 -12422 0
 12419  12420 -12421  728 -12423 0
 12419  12420 -12421  728 -12424 0

c  0-1 --> -1
c    (-b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧ -p_728) -> ( b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0)
c  in CNF:
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨  b^{14, 53}_2
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_1
c     b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨  b^{14, 53}_0
c  in DIMACS:
 12419  12420  12421  728  12422 0
 12419  12420  12421  728 -12423 0
 12419  12420  12421  728  12424 0

c  -1-1 --> -2
c    ( b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧  b^{14, 52}_0 ∧ -p_728) -> ( b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0)
c  in CNF:
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨  b^{14, 53}_2
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨  b^{14, 53}_1
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨  p_728 ∨ -b^{14, 53}_0
c  in DIMACS:
-12419  12420 -12421  728  12422 0
-12419  12420 -12421  728  12423 0
-12419  12420 -12421  728 -12424 0

c  -2-1 --> break 
c    ( b^{14, 52}_2 ∧  b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨  b^{14, 52}_0 ∨  p_728 ∨ break
c  in DIMACS:
-12419 -12420  12421  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 52}_2 ∧ -b^{14, 52}_1 ∧ -b^{14, 52}_0 ∧ true) 
c  in CNF:
c    -b^{14, 52}_2 ∨  b^{14, 52}_1 ∨  b^{14, 52}_0 ∨ false 
c  in DIMACS:
-12419  12420  12421  0

c  3 does not represent an automaton state.
c    -(-b^{14, 52}_2 ∧  b^{14, 52}_1 ∧  b^{14, 52}_0 ∧ true) 
c  in CNF:
c     b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ false 
c  in DIMACS:
 12419 -12420 -12421  0
c  -3 does not represent an automaton state.
c    -( b^{14, 52}_2 ∧  b^{14, 52}_1 ∧  b^{14, 52}_0 ∧ true) 
c  in CNF:
c    -b^{14, 52}_2 ∨ -b^{14, 52}_1 ∨ -b^{14, 52}_0 ∨ false 
c  in DIMACS:
-12419 -12420 -12421  0

c i = 53
c  -2+1 --> -1
c    ( b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧  p_742) -> ( b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0)
c  in CNF:
c    -b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨  b^{14, 54}_2
c    -b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_1
c    -b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨  b^{14, 54}_0
c  in DIMACS:
-12422 -12423  12424 -742  12425 0
-12422 -12423  12424 -742 -12426 0
-12422 -12423  12424 -742  12427 0

c  -1+1 --> 0
c    ( b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0 ∧  p_742) -> (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧ -b^{14, 54}_0)
c  in CNF:
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_2
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_1
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_0
c  in DIMACS:
-12422  12423 -12424 -742 -12425 0
-12422  12423 -12424 -742 -12426 0
-12422  12423 -12424 -742 -12427 0

c  0+1 --> 1
c    (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧  p_742) -> (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0)
c  in CNF:
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_2
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_1
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨  b^{14, 54}_0
c  in DIMACS:
 12422  12423  12424 -742 -12425 0
 12422  12423  12424 -742 -12426 0
 12422  12423  12424 -742  12427 0

c  1+1 --> 2
c    (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0 ∧  p_742) -> (-b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0)
c  in CNF:
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_2
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨  b^{14, 54}_1
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ -p_742 ∨ -b^{14, 54}_0
c  in DIMACS:
 12422  12423 -12424 -742 -12425 0
 12422  12423 -12424 -742  12426 0
 12422  12423 -12424 -742 -12427 0

c  2+1 --> break 
c    (-b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧  p_742) -> break
c  in CNF:
c     b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 12422 -12423  12424 -742 1162 0


c  2-1 --> 1
c    (-b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧ -p_742) -> (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0)
c  in CNF:
c     b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_2
c     b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_1
c     b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨  b^{14, 54}_0
c  in DIMACS:
 12422 -12423  12424  742 -12425 0
 12422 -12423  12424  742 -12426 0
 12422 -12423  12424  742  12427 0

c  1-1 --> 0
c    (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0 ∧ -p_742) -> (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧ -b^{14, 54}_0)
c  in CNF:
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_2
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_1
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_0
c  in DIMACS:
 12422  12423 -12424  742 -12425 0
 12422  12423 -12424  742 -12426 0
 12422  12423 -12424  742 -12427 0

c  0-1 --> -1
c    (-b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧ -p_742) -> ( b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0)
c  in CNF:
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨  b^{14, 54}_2
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_1
c     b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨  b^{14, 54}_0
c  in DIMACS:
 12422  12423  12424  742  12425 0
 12422  12423  12424  742 -12426 0
 12422  12423  12424  742  12427 0

c  -1-1 --> -2
c    ( b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧  b^{14, 53}_0 ∧ -p_742) -> ( b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0)
c  in CNF:
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨  b^{14, 54}_2
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨  b^{14, 54}_1
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨  p_742 ∨ -b^{14, 54}_0
c  in DIMACS:
-12422  12423 -12424  742  12425 0
-12422  12423 -12424  742  12426 0
-12422  12423 -12424  742 -12427 0

c  -2-1 --> break 
c    ( b^{14, 53}_2 ∧  b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨  b^{14, 53}_0 ∨  p_742 ∨ break
c  in DIMACS:
-12422 -12423  12424  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 53}_2 ∧ -b^{14, 53}_1 ∧ -b^{14, 53}_0 ∧ true) 
c  in CNF:
c    -b^{14, 53}_2 ∨  b^{14, 53}_1 ∨  b^{14, 53}_0 ∨ false 
c  in DIMACS:
-12422  12423  12424  0

c  3 does not represent an automaton state.
c    -(-b^{14, 53}_2 ∧  b^{14, 53}_1 ∧  b^{14, 53}_0 ∧ true) 
c  in CNF:
c     b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ false 
c  in DIMACS:
 12422 -12423 -12424  0
c  -3 does not represent an automaton state.
c    -( b^{14, 53}_2 ∧  b^{14, 53}_1 ∧  b^{14, 53}_0 ∧ true) 
c  in CNF:
c    -b^{14, 53}_2 ∨ -b^{14, 53}_1 ∨ -b^{14, 53}_0 ∨ false 
c  in DIMACS:
-12422 -12423 -12424  0

c i = 54
c  -2+1 --> -1
c    ( b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧  p_756) -> ( b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0)
c  in CNF:
c    -b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨  b^{14, 55}_2
c    -b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_1
c    -b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨  b^{14, 55}_0
c  in DIMACS:
-12425 -12426  12427 -756  12428 0
-12425 -12426  12427 -756 -12429 0
-12425 -12426  12427 -756  12430 0

c  -1+1 --> 0
c    ( b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0 ∧  p_756) -> (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧ -b^{14, 55}_0)
c  in CNF:
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_2
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_1
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_0
c  in DIMACS:
-12425  12426 -12427 -756 -12428 0
-12425  12426 -12427 -756 -12429 0
-12425  12426 -12427 -756 -12430 0

c  0+1 --> 1
c    (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧  p_756) -> (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0)
c  in CNF:
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_2
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_1
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨  b^{14, 55}_0
c  in DIMACS:
 12425  12426  12427 -756 -12428 0
 12425  12426  12427 -756 -12429 0
 12425  12426  12427 -756  12430 0

c  1+1 --> 2
c    (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0 ∧  p_756) -> (-b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0)
c  in CNF:
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_2
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨  b^{14, 55}_1
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ -p_756 ∨ -b^{14, 55}_0
c  in DIMACS:
 12425  12426 -12427 -756 -12428 0
 12425  12426 -12427 -756  12429 0
 12425  12426 -12427 -756 -12430 0

c  2+1 --> break 
c    (-b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧  p_756) -> break
c  in CNF:
c     b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 12425 -12426  12427 -756 1162 0


c  2-1 --> 1
c    (-b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧ -p_756) -> (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0)
c  in CNF:
c     b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_2
c     b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_1
c     b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨  b^{14, 55}_0
c  in DIMACS:
 12425 -12426  12427  756 -12428 0
 12425 -12426  12427  756 -12429 0
 12425 -12426  12427  756  12430 0

c  1-1 --> 0
c    (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0 ∧ -p_756) -> (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧ -b^{14, 55}_0)
c  in CNF:
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_2
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_1
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_0
c  in DIMACS:
 12425  12426 -12427  756 -12428 0
 12425  12426 -12427  756 -12429 0
 12425  12426 -12427  756 -12430 0

c  0-1 --> -1
c    (-b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧ -p_756) -> ( b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0)
c  in CNF:
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨  b^{14, 55}_2
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_1
c     b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨  b^{14, 55}_0
c  in DIMACS:
 12425  12426  12427  756  12428 0
 12425  12426  12427  756 -12429 0
 12425  12426  12427  756  12430 0

c  -1-1 --> -2
c    ( b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧  b^{14, 54}_0 ∧ -p_756) -> ( b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0)
c  in CNF:
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨  b^{14, 55}_2
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨  b^{14, 55}_1
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨  p_756 ∨ -b^{14, 55}_0
c  in DIMACS:
-12425  12426 -12427  756  12428 0
-12425  12426 -12427  756  12429 0
-12425  12426 -12427  756 -12430 0

c  -2-1 --> break 
c    ( b^{14, 54}_2 ∧  b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨  b^{14, 54}_0 ∨  p_756 ∨ break
c  in DIMACS:
-12425 -12426  12427  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 54}_2 ∧ -b^{14, 54}_1 ∧ -b^{14, 54}_0 ∧ true) 
c  in CNF:
c    -b^{14, 54}_2 ∨  b^{14, 54}_1 ∨  b^{14, 54}_0 ∨ false 
c  in DIMACS:
-12425  12426  12427  0

c  3 does not represent an automaton state.
c    -(-b^{14, 54}_2 ∧  b^{14, 54}_1 ∧  b^{14, 54}_0 ∧ true) 
c  in CNF:
c     b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ false 
c  in DIMACS:
 12425 -12426 -12427  0
c  -3 does not represent an automaton state.
c    -( b^{14, 54}_2 ∧  b^{14, 54}_1 ∧  b^{14, 54}_0 ∧ true) 
c  in CNF:
c    -b^{14, 54}_2 ∨ -b^{14, 54}_1 ∨ -b^{14, 54}_0 ∨ false 
c  in DIMACS:
-12425 -12426 -12427  0

c i = 55
c  -2+1 --> -1
c    ( b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧  p_770) -> ( b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0)
c  in CNF:
c    -b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨  b^{14, 56}_2
c    -b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_1
c    -b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨  b^{14, 56}_0
c  in DIMACS:
-12428 -12429  12430 -770  12431 0
-12428 -12429  12430 -770 -12432 0
-12428 -12429  12430 -770  12433 0

c  -1+1 --> 0
c    ( b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0 ∧  p_770) -> (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧ -b^{14, 56}_0)
c  in CNF:
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_2
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_1
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_0
c  in DIMACS:
-12428  12429 -12430 -770 -12431 0
-12428  12429 -12430 -770 -12432 0
-12428  12429 -12430 -770 -12433 0

c  0+1 --> 1
c    (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧  p_770) -> (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0)
c  in CNF:
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_2
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_1
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨  b^{14, 56}_0
c  in DIMACS:
 12428  12429  12430 -770 -12431 0
 12428  12429  12430 -770 -12432 0
 12428  12429  12430 -770  12433 0

c  1+1 --> 2
c    (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0 ∧  p_770) -> (-b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0)
c  in CNF:
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_2
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨  b^{14, 56}_1
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ -p_770 ∨ -b^{14, 56}_0
c  in DIMACS:
 12428  12429 -12430 -770 -12431 0
 12428  12429 -12430 -770  12432 0
 12428  12429 -12430 -770 -12433 0

c  2+1 --> break 
c    (-b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧  p_770) -> break
c  in CNF:
c     b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 12428 -12429  12430 -770 1162 0


c  2-1 --> 1
c    (-b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧ -p_770) -> (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0)
c  in CNF:
c     b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_2
c     b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_1
c     b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨  b^{14, 56}_0
c  in DIMACS:
 12428 -12429  12430  770 -12431 0
 12428 -12429  12430  770 -12432 0
 12428 -12429  12430  770  12433 0

c  1-1 --> 0
c    (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0 ∧ -p_770) -> (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧ -b^{14, 56}_0)
c  in CNF:
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_2
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_1
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_0
c  in DIMACS:
 12428  12429 -12430  770 -12431 0
 12428  12429 -12430  770 -12432 0
 12428  12429 -12430  770 -12433 0

c  0-1 --> -1
c    (-b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧ -p_770) -> ( b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0)
c  in CNF:
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨  b^{14, 56}_2
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_1
c     b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨  b^{14, 56}_0
c  in DIMACS:
 12428  12429  12430  770  12431 0
 12428  12429  12430  770 -12432 0
 12428  12429  12430  770  12433 0

c  -1-1 --> -2
c    ( b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧  b^{14, 55}_0 ∧ -p_770) -> ( b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0)
c  in CNF:
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨  b^{14, 56}_2
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨  b^{14, 56}_1
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨  p_770 ∨ -b^{14, 56}_0
c  in DIMACS:
-12428  12429 -12430  770  12431 0
-12428  12429 -12430  770  12432 0
-12428  12429 -12430  770 -12433 0

c  -2-1 --> break 
c    ( b^{14, 55}_2 ∧  b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨  b^{14, 55}_0 ∨  p_770 ∨ break
c  in DIMACS:
-12428 -12429  12430  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 55}_2 ∧ -b^{14, 55}_1 ∧ -b^{14, 55}_0 ∧ true) 
c  in CNF:
c    -b^{14, 55}_2 ∨  b^{14, 55}_1 ∨  b^{14, 55}_0 ∨ false 
c  in DIMACS:
-12428  12429  12430  0

c  3 does not represent an automaton state.
c    -(-b^{14, 55}_2 ∧  b^{14, 55}_1 ∧  b^{14, 55}_0 ∧ true) 
c  in CNF:
c     b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ false 
c  in DIMACS:
 12428 -12429 -12430  0
c  -3 does not represent an automaton state.
c    -( b^{14, 55}_2 ∧  b^{14, 55}_1 ∧  b^{14, 55}_0 ∧ true) 
c  in CNF:
c    -b^{14, 55}_2 ∨ -b^{14, 55}_1 ∨ -b^{14, 55}_0 ∨ false 
c  in DIMACS:
-12428 -12429 -12430  0

c i = 56
c  -2+1 --> -1
c    ( b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧  p_784) -> ( b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0)
c  in CNF:
c    -b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨  b^{14, 57}_2
c    -b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_1
c    -b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨  b^{14, 57}_0
c  in DIMACS:
-12431 -12432  12433 -784  12434 0
-12431 -12432  12433 -784 -12435 0
-12431 -12432  12433 -784  12436 0

c  -1+1 --> 0
c    ( b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0 ∧  p_784) -> (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧ -b^{14, 57}_0)
c  in CNF:
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_2
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_1
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_0
c  in DIMACS:
-12431  12432 -12433 -784 -12434 0
-12431  12432 -12433 -784 -12435 0
-12431  12432 -12433 -784 -12436 0

c  0+1 --> 1
c    (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧  p_784) -> (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0)
c  in CNF:
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_2
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_1
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨  b^{14, 57}_0
c  in DIMACS:
 12431  12432  12433 -784 -12434 0
 12431  12432  12433 -784 -12435 0
 12431  12432  12433 -784  12436 0

c  1+1 --> 2
c    (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0 ∧  p_784) -> (-b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0)
c  in CNF:
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_2
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨  b^{14, 57}_1
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ -p_784 ∨ -b^{14, 57}_0
c  in DIMACS:
 12431  12432 -12433 -784 -12434 0
 12431  12432 -12433 -784  12435 0
 12431  12432 -12433 -784 -12436 0

c  2+1 --> break 
c    (-b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧  p_784) -> break
c  in CNF:
c     b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 12431 -12432  12433 -784 1162 0


c  2-1 --> 1
c    (-b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧ -p_784) -> (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0)
c  in CNF:
c     b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_2
c     b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_1
c     b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨  b^{14, 57}_0
c  in DIMACS:
 12431 -12432  12433  784 -12434 0
 12431 -12432  12433  784 -12435 0
 12431 -12432  12433  784  12436 0

c  1-1 --> 0
c    (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0 ∧ -p_784) -> (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧ -b^{14, 57}_0)
c  in CNF:
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_2
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_1
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_0
c  in DIMACS:
 12431  12432 -12433  784 -12434 0
 12431  12432 -12433  784 -12435 0
 12431  12432 -12433  784 -12436 0

c  0-1 --> -1
c    (-b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧ -p_784) -> ( b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0)
c  in CNF:
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨  b^{14, 57}_2
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_1
c     b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨  b^{14, 57}_0
c  in DIMACS:
 12431  12432  12433  784  12434 0
 12431  12432  12433  784 -12435 0
 12431  12432  12433  784  12436 0

c  -1-1 --> -2
c    ( b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧  b^{14, 56}_0 ∧ -p_784) -> ( b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0)
c  in CNF:
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨  b^{14, 57}_2
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨  b^{14, 57}_1
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨  p_784 ∨ -b^{14, 57}_0
c  in DIMACS:
-12431  12432 -12433  784  12434 0
-12431  12432 -12433  784  12435 0
-12431  12432 -12433  784 -12436 0

c  -2-1 --> break 
c    ( b^{14, 56}_2 ∧  b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨  b^{14, 56}_0 ∨  p_784 ∨ break
c  in DIMACS:
-12431 -12432  12433  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 56}_2 ∧ -b^{14, 56}_1 ∧ -b^{14, 56}_0 ∧ true) 
c  in CNF:
c    -b^{14, 56}_2 ∨  b^{14, 56}_1 ∨  b^{14, 56}_0 ∨ false 
c  in DIMACS:
-12431  12432  12433  0

c  3 does not represent an automaton state.
c    -(-b^{14, 56}_2 ∧  b^{14, 56}_1 ∧  b^{14, 56}_0 ∧ true) 
c  in CNF:
c     b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ false 
c  in DIMACS:
 12431 -12432 -12433  0
c  -3 does not represent an automaton state.
c    -( b^{14, 56}_2 ∧  b^{14, 56}_1 ∧  b^{14, 56}_0 ∧ true) 
c  in CNF:
c    -b^{14, 56}_2 ∨ -b^{14, 56}_1 ∨ -b^{14, 56}_0 ∨ false 
c  in DIMACS:
-12431 -12432 -12433  0

c i = 57
c  -2+1 --> -1
c    ( b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧  p_798) -> ( b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0)
c  in CNF:
c    -b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨  b^{14, 58}_2
c    -b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_1
c    -b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨  b^{14, 58}_0
c  in DIMACS:
-12434 -12435  12436 -798  12437 0
-12434 -12435  12436 -798 -12438 0
-12434 -12435  12436 -798  12439 0

c  -1+1 --> 0
c    ( b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0 ∧  p_798) -> (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧ -b^{14, 58}_0)
c  in CNF:
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_2
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_1
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_0
c  in DIMACS:
-12434  12435 -12436 -798 -12437 0
-12434  12435 -12436 -798 -12438 0
-12434  12435 -12436 -798 -12439 0

c  0+1 --> 1
c    (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧  p_798) -> (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0)
c  in CNF:
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_2
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_1
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨  b^{14, 58}_0
c  in DIMACS:
 12434  12435  12436 -798 -12437 0
 12434  12435  12436 -798 -12438 0
 12434  12435  12436 -798  12439 0

c  1+1 --> 2
c    (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0 ∧  p_798) -> (-b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0)
c  in CNF:
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_2
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨  b^{14, 58}_1
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ -p_798 ∨ -b^{14, 58}_0
c  in DIMACS:
 12434  12435 -12436 -798 -12437 0
 12434  12435 -12436 -798  12438 0
 12434  12435 -12436 -798 -12439 0

c  2+1 --> break 
c    (-b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧  p_798) -> break
c  in CNF:
c     b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 12434 -12435  12436 -798 1162 0


c  2-1 --> 1
c    (-b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧ -p_798) -> (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0)
c  in CNF:
c     b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_2
c     b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_1
c     b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨  b^{14, 58}_0
c  in DIMACS:
 12434 -12435  12436  798 -12437 0
 12434 -12435  12436  798 -12438 0
 12434 -12435  12436  798  12439 0

c  1-1 --> 0
c    (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0 ∧ -p_798) -> (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧ -b^{14, 58}_0)
c  in CNF:
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_2
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_1
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_0
c  in DIMACS:
 12434  12435 -12436  798 -12437 0
 12434  12435 -12436  798 -12438 0
 12434  12435 -12436  798 -12439 0

c  0-1 --> -1
c    (-b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧ -p_798) -> ( b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0)
c  in CNF:
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨  b^{14, 58}_2
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_1
c     b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨  b^{14, 58}_0
c  in DIMACS:
 12434  12435  12436  798  12437 0
 12434  12435  12436  798 -12438 0
 12434  12435  12436  798  12439 0

c  -1-1 --> -2
c    ( b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧  b^{14, 57}_0 ∧ -p_798) -> ( b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0)
c  in CNF:
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨  b^{14, 58}_2
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨  b^{14, 58}_1
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨  p_798 ∨ -b^{14, 58}_0
c  in DIMACS:
-12434  12435 -12436  798  12437 0
-12434  12435 -12436  798  12438 0
-12434  12435 -12436  798 -12439 0

c  -2-1 --> break 
c    ( b^{14, 57}_2 ∧  b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨  b^{14, 57}_0 ∨  p_798 ∨ break
c  in DIMACS:
-12434 -12435  12436  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 57}_2 ∧ -b^{14, 57}_1 ∧ -b^{14, 57}_0 ∧ true) 
c  in CNF:
c    -b^{14, 57}_2 ∨  b^{14, 57}_1 ∨  b^{14, 57}_0 ∨ false 
c  in DIMACS:
-12434  12435  12436  0

c  3 does not represent an automaton state.
c    -(-b^{14, 57}_2 ∧  b^{14, 57}_1 ∧  b^{14, 57}_0 ∧ true) 
c  in CNF:
c     b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ false 
c  in DIMACS:
 12434 -12435 -12436  0
c  -3 does not represent an automaton state.
c    -( b^{14, 57}_2 ∧  b^{14, 57}_1 ∧  b^{14, 57}_0 ∧ true) 
c  in CNF:
c    -b^{14, 57}_2 ∨ -b^{14, 57}_1 ∨ -b^{14, 57}_0 ∨ false 
c  in DIMACS:
-12434 -12435 -12436  0

c i = 58
c  -2+1 --> -1
c    ( b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧  p_812) -> ( b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0)
c  in CNF:
c    -b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨  b^{14, 59}_2
c    -b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_1
c    -b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨  b^{14, 59}_0
c  in DIMACS:
-12437 -12438  12439 -812  12440 0
-12437 -12438  12439 -812 -12441 0
-12437 -12438  12439 -812  12442 0

c  -1+1 --> 0
c    ( b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0 ∧  p_812) -> (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧ -b^{14, 59}_0)
c  in CNF:
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_2
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_1
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_0
c  in DIMACS:
-12437  12438 -12439 -812 -12440 0
-12437  12438 -12439 -812 -12441 0
-12437  12438 -12439 -812 -12442 0

c  0+1 --> 1
c    (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧  p_812) -> (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0)
c  in CNF:
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_2
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_1
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨  b^{14, 59}_0
c  in DIMACS:
 12437  12438  12439 -812 -12440 0
 12437  12438  12439 -812 -12441 0
 12437  12438  12439 -812  12442 0

c  1+1 --> 2
c    (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0 ∧  p_812) -> (-b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0)
c  in CNF:
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_2
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨  b^{14, 59}_1
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ -p_812 ∨ -b^{14, 59}_0
c  in DIMACS:
 12437  12438 -12439 -812 -12440 0
 12437  12438 -12439 -812  12441 0
 12437  12438 -12439 -812 -12442 0

c  2+1 --> break 
c    (-b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧  p_812) -> break
c  in CNF:
c     b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 12437 -12438  12439 -812 1162 0


c  2-1 --> 1
c    (-b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧ -p_812) -> (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0)
c  in CNF:
c     b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_2
c     b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_1
c     b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨  b^{14, 59}_0
c  in DIMACS:
 12437 -12438  12439  812 -12440 0
 12437 -12438  12439  812 -12441 0
 12437 -12438  12439  812  12442 0

c  1-1 --> 0
c    (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0 ∧ -p_812) -> (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧ -b^{14, 59}_0)
c  in CNF:
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_2
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_1
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_0
c  in DIMACS:
 12437  12438 -12439  812 -12440 0
 12437  12438 -12439  812 -12441 0
 12437  12438 -12439  812 -12442 0

c  0-1 --> -1
c    (-b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧ -p_812) -> ( b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0)
c  in CNF:
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨  b^{14, 59}_2
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_1
c     b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨  b^{14, 59}_0
c  in DIMACS:
 12437  12438  12439  812  12440 0
 12437  12438  12439  812 -12441 0
 12437  12438  12439  812  12442 0

c  -1-1 --> -2
c    ( b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧  b^{14, 58}_0 ∧ -p_812) -> ( b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0)
c  in CNF:
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨  b^{14, 59}_2
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨  b^{14, 59}_1
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨  p_812 ∨ -b^{14, 59}_0
c  in DIMACS:
-12437  12438 -12439  812  12440 0
-12437  12438 -12439  812  12441 0
-12437  12438 -12439  812 -12442 0

c  -2-1 --> break 
c    ( b^{14, 58}_2 ∧  b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨  b^{14, 58}_0 ∨  p_812 ∨ break
c  in DIMACS:
-12437 -12438  12439  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 58}_2 ∧ -b^{14, 58}_1 ∧ -b^{14, 58}_0 ∧ true) 
c  in CNF:
c    -b^{14, 58}_2 ∨  b^{14, 58}_1 ∨  b^{14, 58}_0 ∨ false 
c  in DIMACS:
-12437  12438  12439  0

c  3 does not represent an automaton state.
c    -(-b^{14, 58}_2 ∧  b^{14, 58}_1 ∧  b^{14, 58}_0 ∧ true) 
c  in CNF:
c     b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ false 
c  in DIMACS:
 12437 -12438 -12439  0
c  -3 does not represent an automaton state.
c    -( b^{14, 58}_2 ∧  b^{14, 58}_1 ∧  b^{14, 58}_0 ∧ true) 
c  in CNF:
c    -b^{14, 58}_2 ∨ -b^{14, 58}_1 ∨ -b^{14, 58}_0 ∨ false 
c  in DIMACS:
-12437 -12438 -12439  0

c i = 59
c  -2+1 --> -1
c    ( b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧  p_826) -> ( b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0)
c  in CNF:
c    -b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨  b^{14, 60}_2
c    -b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_1
c    -b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨  b^{14, 60}_0
c  in DIMACS:
-12440 -12441  12442 -826  12443 0
-12440 -12441  12442 -826 -12444 0
-12440 -12441  12442 -826  12445 0

c  -1+1 --> 0
c    ( b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0 ∧  p_826) -> (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧ -b^{14, 60}_0)
c  in CNF:
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_2
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_1
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_0
c  in DIMACS:
-12440  12441 -12442 -826 -12443 0
-12440  12441 -12442 -826 -12444 0
-12440  12441 -12442 -826 -12445 0

c  0+1 --> 1
c    (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧  p_826) -> (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0)
c  in CNF:
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_2
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_1
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨  b^{14, 60}_0
c  in DIMACS:
 12440  12441  12442 -826 -12443 0
 12440  12441  12442 -826 -12444 0
 12440  12441  12442 -826  12445 0

c  1+1 --> 2
c    (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0 ∧  p_826) -> (-b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0)
c  in CNF:
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_2
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨  b^{14, 60}_1
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ -p_826 ∨ -b^{14, 60}_0
c  in DIMACS:
 12440  12441 -12442 -826 -12443 0
 12440  12441 -12442 -826  12444 0
 12440  12441 -12442 -826 -12445 0

c  2+1 --> break 
c    (-b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧  p_826) -> break
c  in CNF:
c     b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 12440 -12441  12442 -826 1162 0


c  2-1 --> 1
c    (-b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧ -p_826) -> (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0)
c  in CNF:
c     b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_2
c     b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_1
c     b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨  b^{14, 60}_0
c  in DIMACS:
 12440 -12441  12442  826 -12443 0
 12440 -12441  12442  826 -12444 0
 12440 -12441  12442  826  12445 0

c  1-1 --> 0
c    (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0 ∧ -p_826) -> (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧ -b^{14, 60}_0)
c  in CNF:
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_2
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_1
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_0
c  in DIMACS:
 12440  12441 -12442  826 -12443 0
 12440  12441 -12442  826 -12444 0
 12440  12441 -12442  826 -12445 0

c  0-1 --> -1
c    (-b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧ -p_826) -> ( b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0)
c  in CNF:
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨  b^{14, 60}_2
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_1
c     b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨  b^{14, 60}_0
c  in DIMACS:
 12440  12441  12442  826  12443 0
 12440  12441  12442  826 -12444 0
 12440  12441  12442  826  12445 0

c  -1-1 --> -2
c    ( b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧  b^{14, 59}_0 ∧ -p_826) -> ( b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0)
c  in CNF:
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨  b^{14, 60}_2
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨  b^{14, 60}_1
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨  p_826 ∨ -b^{14, 60}_0
c  in DIMACS:
-12440  12441 -12442  826  12443 0
-12440  12441 -12442  826  12444 0
-12440  12441 -12442  826 -12445 0

c  -2-1 --> break 
c    ( b^{14, 59}_2 ∧  b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨  b^{14, 59}_0 ∨  p_826 ∨ break
c  in DIMACS:
-12440 -12441  12442  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 59}_2 ∧ -b^{14, 59}_1 ∧ -b^{14, 59}_0 ∧ true) 
c  in CNF:
c    -b^{14, 59}_2 ∨  b^{14, 59}_1 ∨  b^{14, 59}_0 ∨ false 
c  in DIMACS:
-12440  12441  12442  0

c  3 does not represent an automaton state.
c    -(-b^{14, 59}_2 ∧  b^{14, 59}_1 ∧  b^{14, 59}_0 ∧ true) 
c  in CNF:
c     b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ false 
c  in DIMACS:
 12440 -12441 -12442  0
c  -3 does not represent an automaton state.
c    -( b^{14, 59}_2 ∧  b^{14, 59}_1 ∧  b^{14, 59}_0 ∧ true) 
c  in CNF:
c    -b^{14, 59}_2 ∨ -b^{14, 59}_1 ∨ -b^{14, 59}_0 ∨ false 
c  in DIMACS:
-12440 -12441 -12442  0

c i = 60
c  -2+1 --> -1
c    ( b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧  p_840) -> ( b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0)
c  in CNF:
c    -b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨  b^{14, 61}_2
c    -b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_1
c    -b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨  b^{14, 61}_0
c  in DIMACS:
-12443 -12444  12445 -840  12446 0
-12443 -12444  12445 -840 -12447 0
-12443 -12444  12445 -840  12448 0

c  -1+1 --> 0
c    ( b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0 ∧  p_840) -> (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧ -b^{14, 61}_0)
c  in CNF:
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_2
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_1
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_0
c  in DIMACS:
-12443  12444 -12445 -840 -12446 0
-12443  12444 -12445 -840 -12447 0
-12443  12444 -12445 -840 -12448 0

c  0+1 --> 1
c    (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧  p_840) -> (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0)
c  in CNF:
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_2
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_1
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨  b^{14, 61}_0
c  in DIMACS:
 12443  12444  12445 -840 -12446 0
 12443  12444  12445 -840 -12447 0
 12443  12444  12445 -840  12448 0

c  1+1 --> 2
c    (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0 ∧  p_840) -> (-b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0)
c  in CNF:
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_2
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨  b^{14, 61}_1
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ -p_840 ∨ -b^{14, 61}_0
c  in DIMACS:
 12443  12444 -12445 -840 -12446 0
 12443  12444 -12445 -840  12447 0
 12443  12444 -12445 -840 -12448 0

c  2+1 --> break 
c    (-b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧  p_840) -> break
c  in CNF:
c     b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 12443 -12444  12445 -840 1162 0


c  2-1 --> 1
c    (-b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧ -p_840) -> (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0)
c  in CNF:
c     b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_2
c     b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_1
c     b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨  b^{14, 61}_0
c  in DIMACS:
 12443 -12444  12445  840 -12446 0
 12443 -12444  12445  840 -12447 0
 12443 -12444  12445  840  12448 0

c  1-1 --> 0
c    (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0 ∧ -p_840) -> (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧ -b^{14, 61}_0)
c  in CNF:
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_2
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_1
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_0
c  in DIMACS:
 12443  12444 -12445  840 -12446 0
 12443  12444 -12445  840 -12447 0
 12443  12444 -12445  840 -12448 0

c  0-1 --> -1
c    (-b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧ -p_840) -> ( b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0)
c  in CNF:
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨  b^{14, 61}_2
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_1
c     b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨  b^{14, 61}_0
c  in DIMACS:
 12443  12444  12445  840  12446 0
 12443  12444  12445  840 -12447 0
 12443  12444  12445  840  12448 0

c  -1-1 --> -2
c    ( b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧  b^{14, 60}_0 ∧ -p_840) -> ( b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0)
c  in CNF:
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨  b^{14, 61}_2
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨  b^{14, 61}_1
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨  p_840 ∨ -b^{14, 61}_0
c  in DIMACS:
-12443  12444 -12445  840  12446 0
-12443  12444 -12445  840  12447 0
-12443  12444 -12445  840 -12448 0

c  -2-1 --> break 
c    ( b^{14, 60}_2 ∧  b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨  b^{14, 60}_0 ∨  p_840 ∨ break
c  in DIMACS:
-12443 -12444  12445  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 60}_2 ∧ -b^{14, 60}_1 ∧ -b^{14, 60}_0 ∧ true) 
c  in CNF:
c    -b^{14, 60}_2 ∨  b^{14, 60}_1 ∨  b^{14, 60}_0 ∨ false 
c  in DIMACS:
-12443  12444  12445  0

c  3 does not represent an automaton state.
c    -(-b^{14, 60}_2 ∧  b^{14, 60}_1 ∧  b^{14, 60}_0 ∧ true) 
c  in CNF:
c     b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ false 
c  in DIMACS:
 12443 -12444 -12445  0
c  -3 does not represent an automaton state.
c    -( b^{14, 60}_2 ∧  b^{14, 60}_1 ∧  b^{14, 60}_0 ∧ true) 
c  in CNF:
c    -b^{14, 60}_2 ∨ -b^{14, 60}_1 ∨ -b^{14, 60}_0 ∨ false 
c  in DIMACS:
-12443 -12444 -12445  0

c i = 61
c  -2+1 --> -1
c    ( b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧  p_854) -> ( b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0)
c  in CNF:
c    -b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨  b^{14, 62}_2
c    -b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_1
c    -b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨  b^{14, 62}_0
c  in DIMACS:
-12446 -12447  12448 -854  12449 0
-12446 -12447  12448 -854 -12450 0
-12446 -12447  12448 -854  12451 0

c  -1+1 --> 0
c    ( b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0 ∧  p_854) -> (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧ -b^{14, 62}_0)
c  in CNF:
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_2
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_1
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_0
c  in DIMACS:
-12446  12447 -12448 -854 -12449 0
-12446  12447 -12448 -854 -12450 0
-12446  12447 -12448 -854 -12451 0

c  0+1 --> 1
c    (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧  p_854) -> (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0)
c  in CNF:
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_2
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_1
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨  b^{14, 62}_0
c  in DIMACS:
 12446  12447  12448 -854 -12449 0
 12446  12447  12448 -854 -12450 0
 12446  12447  12448 -854  12451 0

c  1+1 --> 2
c    (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0 ∧  p_854) -> (-b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0)
c  in CNF:
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_2
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨  b^{14, 62}_1
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ -p_854 ∨ -b^{14, 62}_0
c  in DIMACS:
 12446  12447 -12448 -854 -12449 0
 12446  12447 -12448 -854  12450 0
 12446  12447 -12448 -854 -12451 0

c  2+1 --> break 
c    (-b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧  p_854) -> break
c  in CNF:
c     b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 12446 -12447  12448 -854 1162 0


c  2-1 --> 1
c    (-b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧ -p_854) -> (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0)
c  in CNF:
c     b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_2
c     b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_1
c     b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨  b^{14, 62}_0
c  in DIMACS:
 12446 -12447  12448  854 -12449 0
 12446 -12447  12448  854 -12450 0
 12446 -12447  12448  854  12451 0

c  1-1 --> 0
c    (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0 ∧ -p_854) -> (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧ -b^{14, 62}_0)
c  in CNF:
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_2
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_1
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_0
c  in DIMACS:
 12446  12447 -12448  854 -12449 0
 12446  12447 -12448  854 -12450 0
 12446  12447 -12448  854 -12451 0

c  0-1 --> -1
c    (-b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧ -p_854) -> ( b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0)
c  in CNF:
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨  b^{14, 62}_2
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_1
c     b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨  b^{14, 62}_0
c  in DIMACS:
 12446  12447  12448  854  12449 0
 12446  12447  12448  854 -12450 0
 12446  12447  12448  854  12451 0

c  -1-1 --> -2
c    ( b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧  b^{14, 61}_0 ∧ -p_854) -> ( b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0)
c  in CNF:
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨  b^{14, 62}_2
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨  b^{14, 62}_1
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨  p_854 ∨ -b^{14, 62}_0
c  in DIMACS:
-12446  12447 -12448  854  12449 0
-12446  12447 -12448  854  12450 0
-12446  12447 -12448  854 -12451 0

c  -2-1 --> break 
c    ( b^{14, 61}_2 ∧  b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨  b^{14, 61}_0 ∨  p_854 ∨ break
c  in DIMACS:
-12446 -12447  12448  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 61}_2 ∧ -b^{14, 61}_1 ∧ -b^{14, 61}_0 ∧ true) 
c  in CNF:
c    -b^{14, 61}_2 ∨  b^{14, 61}_1 ∨  b^{14, 61}_0 ∨ false 
c  in DIMACS:
-12446  12447  12448  0

c  3 does not represent an automaton state.
c    -(-b^{14, 61}_2 ∧  b^{14, 61}_1 ∧  b^{14, 61}_0 ∧ true) 
c  in CNF:
c     b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ false 
c  in DIMACS:
 12446 -12447 -12448  0
c  -3 does not represent an automaton state.
c    -( b^{14, 61}_2 ∧  b^{14, 61}_1 ∧  b^{14, 61}_0 ∧ true) 
c  in CNF:
c    -b^{14, 61}_2 ∨ -b^{14, 61}_1 ∨ -b^{14, 61}_0 ∨ false 
c  in DIMACS:
-12446 -12447 -12448  0

c i = 62
c  -2+1 --> -1
c    ( b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧  p_868) -> ( b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0)
c  in CNF:
c    -b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨  b^{14, 63}_2
c    -b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_1
c    -b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨  b^{14, 63}_0
c  in DIMACS:
-12449 -12450  12451 -868  12452 0
-12449 -12450  12451 -868 -12453 0
-12449 -12450  12451 -868  12454 0

c  -1+1 --> 0
c    ( b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0 ∧  p_868) -> (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧ -b^{14, 63}_0)
c  in CNF:
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_2
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_1
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_0
c  in DIMACS:
-12449  12450 -12451 -868 -12452 0
-12449  12450 -12451 -868 -12453 0
-12449  12450 -12451 -868 -12454 0

c  0+1 --> 1
c    (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧  p_868) -> (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0)
c  in CNF:
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_2
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_1
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨  b^{14, 63}_0
c  in DIMACS:
 12449  12450  12451 -868 -12452 0
 12449  12450  12451 -868 -12453 0
 12449  12450  12451 -868  12454 0

c  1+1 --> 2
c    (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0 ∧  p_868) -> (-b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0)
c  in CNF:
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_2
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨  b^{14, 63}_1
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ -p_868 ∨ -b^{14, 63}_0
c  in DIMACS:
 12449  12450 -12451 -868 -12452 0
 12449  12450 -12451 -868  12453 0
 12449  12450 -12451 -868 -12454 0

c  2+1 --> break 
c    (-b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧  p_868) -> break
c  in CNF:
c     b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 12449 -12450  12451 -868 1162 0


c  2-1 --> 1
c    (-b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧ -p_868) -> (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0)
c  in CNF:
c     b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_2
c     b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_1
c     b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨  b^{14, 63}_0
c  in DIMACS:
 12449 -12450  12451  868 -12452 0
 12449 -12450  12451  868 -12453 0
 12449 -12450  12451  868  12454 0

c  1-1 --> 0
c    (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0 ∧ -p_868) -> (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧ -b^{14, 63}_0)
c  in CNF:
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_2
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_1
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_0
c  in DIMACS:
 12449  12450 -12451  868 -12452 0
 12449  12450 -12451  868 -12453 0
 12449  12450 -12451  868 -12454 0

c  0-1 --> -1
c    (-b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧ -p_868) -> ( b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0)
c  in CNF:
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨  b^{14, 63}_2
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_1
c     b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨  b^{14, 63}_0
c  in DIMACS:
 12449  12450  12451  868  12452 0
 12449  12450  12451  868 -12453 0
 12449  12450  12451  868  12454 0

c  -1-1 --> -2
c    ( b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧  b^{14, 62}_0 ∧ -p_868) -> ( b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0)
c  in CNF:
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨  b^{14, 63}_2
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨  b^{14, 63}_1
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨  p_868 ∨ -b^{14, 63}_0
c  in DIMACS:
-12449  12450 -12451  868  12452 0
-12449  12450 -12451  868  12453 0
-12449  12450 -12451  868 -12454 0

c  -2-1 --> break 
c    ( b^{14, 62}_2 ∧  b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨  b^{14, 62}_0 ∨  p_868 ∨ break
c  in DIMACS:
-12449 -12450  12451  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 62}_2 ∧ -b^{14, 62}_1 ∧ -b^{14, 62}_0 ∧ true) 
c  in CNF:
c    -b^{14, 62}_2 ∨  b^{14, 62}_1 ∨  b^{14, 62}_0 ∨ false 
c  in DIMACS:
-12449  12450  12451  0

c  3 does not represent an automaton state.
c    -(-b^{14, 62}_2 ∧  b^{14, 62}_1 ∧  b^{14, 62}_0 ∧ true) 
c  in CNF:
c     b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ false 
c  in DIMACS:
 12449 -12450 -12451  0
c  -3 does not represent an automaton state.
c    -( b^{14, 62}_2 ∧  b^{14, 62}_1 ∧  b^{14, 62}_0 ∧ true) 
c  in CNF:
c    -b^{14, 62}_2 ∨ -b^{14, 62}_1 ∨ -b^{14, 62}_0 ∨ false 
c  in DIMACS:
-12449 -12450 -12451  0

c i = 63
c  -2+1 --> -1
c    ( b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧  p_882) -> ( b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0)
c  in CNF:
c    -b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨  b^{14, 64}_2
c    -b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_1
c    -b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨  b^{14, 64}_0
c  in DIMACS:
-12452 -12453  12454 -882  12455 0
-12452 -12453  12454 -882 -12456 0
-12452 -12453  12454 -882  12457 0

c  -1+1 --> 0
c    ( b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0 ∧  p_882) -> (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧ -b^{14, 64}_0)
c  in CNF:
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_2
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_1
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_0
c  in DIMACS:
-12452  12453 -12454 -882 -12455 0
-12452  12453 -12454 -882 -12456 0
-12452  12453 -12454 -882 -12457 0

c  0+1 --> 1
c    (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧  p_882) -> (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0)
c  in CNF:
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_2
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_1
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨  b^{14, 64}_0
c  in DIMACS:
 12452  12453  12454 -882 -12455 0
 12452  12453  12454 -882 -12456 0
 12452  12453  12454 -882  12457 0

c  1+1 --> 2
c    (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0 ∧  p_882) -> (-b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0)
c  in CNF:
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_2
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨  b^{14, 64}_1
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ -p_882 ∨ -b^{14, 64}_0
c  in DIMACS:
 12452  12453 -12454 -882 -12455 0
 12452  12453 -12454 -882  12456 0
 12452  12453 -12454 -882 -12457 0

c  2+1 --> break 
c    (-b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧  p_882) -> break
c  in CNF:
c     b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 12452 -12453  12454 -882 1162 0


c  2-1 --> 1
c    (-b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧ -p_882) -> (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0)
c  in CNF:
c     b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_2
c     b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_1
c     b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨  b^{14, 64}_0
c  in DIMACS:
 12452 -12453  12454  882 -12455 0
 12452 -12453  12454  882 -12456 0
 12452 -12453  12454  882  12457 0

c  1-1 --> 0
c    (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0 ∧ -p_882) -> (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧ -b^{14, 64}_0)
c  in CNF:
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_2
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_1
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_0
c  in DIMACS:
 12452  12453 -12454  882 -12455 0
 12452  12453 -12454  882 -12456 0
 12452  12453 -12454  882 -12457 0

c  0-1 --> -1
c    (-b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧ -p_882) -> ( b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0)
c  in CNF:
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨  b^{14, 64}_2
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_1
c     b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨  b^{14, 64}_0
c  in DIMACS:
 12452  12453  12454  882  12455 0
 12452  12453  12454  882 -12456 0
 12452  12453  12454  882  12457 0

c  -1-1 --> -2
c    ( b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧  b^{14, 63}_0 ∧ -p_882) -> ( b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0)
c  in CNF:
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨  b^{14, 64}_2
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨  b^{14, 64}_1
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨  p_882 ∨ -b^{14, 64}_0
c  in DIMACS:
-12452  12453 -12454  882  12455 0
-12452  12453 -12454  882  12456 0
-12452  12453 -12454  882 -12457 0

c  -2-1 --> break 
c    ( b^{14, 63}_2 ∧  b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨  b^{14, 63}_0 ∨  p_882 ∨ break
c  in DIMACS:
-12452 -12453  12454  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 63}_2 ∧ -b^{14, 63}_1 ∧ -b^{14, 63}_0 ∧ true) 
c  in CNF:
c    -b^{14, 63}_2 ∨  b^{14, 63}_1 ∨  b^{14, 63}_0 ∨ false 
c  in DIMACS:
-12452  12453  12454  0

c  3 does not represent an automaton state.
c    -(-b^{14, 63}_2 ∧  b^{14, 63}_1 ∧  b^{14, 63}_0 ∧ true) 
c  in CNF:
c     b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ false 
c  in DIMACS:
 12452 -12453 -12454  0
c  -3 does not represent an automaton state.
c    -( b^{14, 63}_2 ∧  b^{14, 63}_1 ∧  b^{14, 63}_0 ∧ true) 
c  in CNF:
c    -b^{14, 63}_2 ∨ -b^{14, 63}_1 ∨ -b^{14, 63}_0 ∨ false 
c  in DIMACS:
-12452 -12453 -12454  0

c i = 64
c  -2+1 --> -1
c    ( b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧  p_896) -> ( b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0)
c  in CNF:
c    -b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨  b^{14, 65}_2
c    -b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_1
c    -b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨  b^{14, 65}_0
c  in DIMACS:
-12455 -12456  12457 -896  12458 0
-12455 -12456  12457 -896 -12459 0
-12455 -12456  12457 -896  12460 0

c  -1+1 --> 0
c    ( b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0 ∧  p_896) -> (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧ -b^{14, 65}_0)
c  in CNF:
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_2
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_1
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_0
c  in DIMACS:
-12455  12456 -12457 -896 -12458 0
-12455  12456 -12457 -896 -12459 0
-12455  12456 -12457 -896 -12460 0

c  0+1 --> 1
c    (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧  p_896) -> (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0)
c  in CNF:
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_2
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_1
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨  b^{14, 65}_0
c  in DIMACS:
 12455  12456  12457 -896 -12458 0
 12455  12456  12457 -896 -12459 0
 12455  12456  12457 -896  12460 0

c  1+1 --> 2
c    (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0 ∧  p_896) -> (-b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0)
c  in CNF:
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_2
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨  b^{14, 65}_1
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ -p_896 ∨ -b^{14, 65}_0
c  in DIMACS:
 12455  12456 -12457 -896 -12458 0
 12455  12456 -12457 -896  12459 0
 12455  12456 -12457 -896 -12460 0

c  2+1 --> break 
c    (-b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧  p_896) -> break
c  in CNF:
c     b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 12455 -12456  12457 -896 1162 0


c  2-1 --> 1
c    (-b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧ -p_896) -> (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0)
c  in CNF:
c     b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_2
c     b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_1
c     b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨  b^{14, 65}_0
c  in DIMACS:
 12455 -12456  12457  896 -12458 0
 12455 -12456  12457  896 -12459 0
 12455 -12456  12457  896  12460 0

c  1-1 --> 0
c    (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0 ∧ -p_896) -> (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧ -b^{14, 65}_0)
c  in CNF:
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_2
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_1
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_0
c  in DIMACS:
 12455  12456 -12457  896 -12458 0
 12455  12456 -12457  896 -12459 0
 12455  12456 -12457  896 -12460 0

c  0-1 --> -1
c    (-b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧ -p_896) -> ( b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0)
c  in CNF:
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨  b^{14, 65}_2
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_1
c     b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨  b^{14, 65}_0
c  in DIMACS:
 12455  12456  12457  896  12458 0
 12455  12456  12457  896 -12459 0
 12455  12456  12457  896  12460 0

c  -1-1 --> -2
c    ( b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧  b^{14, 64}_0 ∧ -p_896) -> ( b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0)
c  in CNF:
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨  b^{14, 65}_2
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨  b^{14, 65}_1
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨  p_896 ∨ -b^{14, 65}_0
c  in DIMACS:
-12455  12456 -12457  896  12458 0
-12455  12456 -12457  896  12459 0
-12455  12456 -12457  896 -12460 0

c  -2-1 --> break 
c    ( b^{14, 64}_2 ∧  b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨  b^{14, 64}_0 ∨  p_896 ∨ break
c  in DIMACS:
-12455 -12456  12457  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 64}_2 ∧ -b^{14, 64}_1 ∧ -b^{14, 64}_0 ∧ true) 
c  in CNF:
c    -b^{14, 64}_2 ∨  b^{14, 64}_1 ∨  b^{14, 64}_0 ∨ false 
c  in DIMACS:
-12455  12456  12457  0

c  3 does not represent an automaton state.
c    -(-b^{14, 64}_2 ∧  b^{14, 64}_1 ∧  b^{14, 64}_0 ∧ true) 
c  in CNF:
c     b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ false 
c  in DIMACS:
 12455 -12456 -12457  0
c  -3 does not represent an automaton state.
c    -( b^{14, 64}_2 ∧  b^{14, 64}_1 ∧  b^{14, 64}_0 ∧ true) 
c  in CNF:
c    -b^{14, 64}_2 ∨ -b^{14, 64}_1 ∨ -b^{14, 64}_0 ∨ false 
c  in DIMACS:
-12455 -12456 -12457  0

c i = 65
c  -2+1 --> -1
c    ( b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧  p_910) -> ( b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0)
c  in CNF:
c    -b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨  b^{14, 66}_2
c    -b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_1
c    -b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨  b^{14, 66}_0
c  in DIMACS:
-12458 -12459  12460 -910  12461 0
-12458 -12459  12460 -910 -12462 0
-12458 -12459  12460 -910  12463 0

c  -1+1 --> 0
c    ( b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0 ∧  p_910) -> (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧ -b^{14, 66}_0)
c  in CNF:
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_2
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_1
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_0
c  in DIMACS:
-12458  12459 -12460 -910 -12461 0
-12458  12459 -12460 -910 -12462 0
-12458  12459 -12460 -910 -12463 0

c  0+1 --> 1
c    (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧  p_910) -> (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0)
c  in CNF:
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_2
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_1
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨  b^{14, 66}_0
c  in DIMACS:
 12458  12459  12460 -910 -12461 0
 12458  12459  12460 -910 -12462 0
 12458  12459  12460 -910  12463 0

c  1+1 --> 2
c    (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0 ∧  p_910) -> (-b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0)
c  in CNF:
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_2
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨  b^{14, 66}_1
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ -p_910 ∨ -b^{14, 66}_0
c  in DIMACS:
 12458  12459 -12460 -910 -12461 0
 12458  12459 -12460 -910  12462 0
 12458  12459 -12460 -910 -12463 0

c  2+1 --> break 
c    (-b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧  p_910) -> break
c  in CNF:
c     b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 12458 -12459  12460 -910 1162 0


c  2-1 --> 1
c    (-b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧ -p_910) -> (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0)
c  in CNF:
c     b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_2
c     b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_1
c     b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨  b^{14, 66}_0
c  in DIMACS:
 12458 -12459  12460  910 -12461 0
 12458 -12459  12460  910 -12462 0
 12458 -12459  12460  910  12463 0

c  1-1 --> 0
c    (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0 ∧ -p_910) -> (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧ -b^{14, 66}_0)
c  in CNF:
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_2
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_1
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_0
c  in DIMACS:
 12458  12459 -12460  910 -12461 0
 12458  12459 -12460  910 -12462 0
 12458  12459 -12460  910 -12463 0

c  0-1 --> -1
c    (-b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧ -p_910) -> ( b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0)
c  in CNF:
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨  b^{14, 66}_2
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_1
c     b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨  b^{14, 66}_0
c  in DIMACS:
 12458  12459  12460  910  12461 0
 12458  12459  12460  910 -12462 0
 12458  12459  12460  910  12463 0

c  -1-1 --> -2
c    ( b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧  b^{14, 65}_0 ∧ -p_910) -> ( b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0)
c  in CNF:
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨  b^{14, 66}_2
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨  b^{14, 66}_1
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨  p_910 ∨ -b^{14, 66}_0
c  in DIMACS:
-12458  12459 -12460  910  12461 0
-12458  12459 -12460  910  12462 0
-12458  12459 -12460  910 -12463 0

c  -2-1 --> break 
c    ( b^{14, 65}_2 ∧  b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨  b^{14, 65}_0 ∨  p_910 ∨ break
c  in DIMACS:
-12458 -12459  12460  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 65}_2 ∧ -b^{14, 65}_1 ∧ -b^{14, 65}_0 ∧ true) 
c  in CNF:
c    -b^{14, 65}_2 ∨  b^{14, 65}_1 ∨  b^{14, 65}_0 ∨ false 
c  in DIMACS:
-12458  12459  12460  0

c  3 does not represent an automaton state.
c    -(-b^{14, 65}_2 ∧  b^{14, 65}_1 ∧  b^{14, 65}_0 ∧ true) 
c  in CNF:
c     b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ false 
c  in DIMACS:
 12458 -12459 -12460  0
c  -3 does not represent an automaton state.
c    -( b^{14, 65}_2 ∧  b^{14, 65}_1 ∧  b^{14, 65}_0 ∧ true) 
c  in CNF:
c    -b^{14, 65}_2 ∨ -b^{14, 65}_1 ∨ -b^{14, 65}_0 ∨ false 
c  in DIMACS:
-12458 -12459 -12460  0

c i = 66
c  -2+1 --> -1
c    ( b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧  p_924) -> ( b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0)
c  in CNF:
c    -b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨  b^{14, 67}_2
c    -b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_1
c    -b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨  b^{14, 67}_0
c  in DIMACS:
-12461 -12462  12463 -924  12464 0
-12461 -12462  12463 -924 -12465 0
-12461 -12462  12463 -924  12466 0

c  -1+1 --> 0
c    ( b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0 ∧  p_924) -> (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧ -b^{14, 67}_0)
c  in CNF:
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_2
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_1
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_0
c  in DIMACS:
-12461  12462 -12463 -924 -12464 0
-12461  12462 -12463 -924 -12465 0
-12461  12462 -12463 -924 -12466 0

c  0+1 --> 1
c    (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧  p_924) -> (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0)
c  in CNF:
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_2
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_1
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨  b^{14, 67}_0
c  in DIMACS:
 12461  12462  12463 -924 -12464 0
 12461  12462  12463 -924 -12465 0
 12461  12462  12463 -924  12466 0

c  1+1 --> 2
c    (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0 ∧  p_924) -> (-b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0)
c  in CNF:
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_2
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨  b^{14, 67}_1
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ -p_924 ∨ -b^{14, 67}_0
c  in DIMACS:
 12461  12462 -12463 -924 -12464 0
 12461  12462 -12463 -924  12465 0
 12461  12462 -12463 -924 -12466 0

c  2+1 --> break 
c    (-b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧  p_924) -> break
c  in CNF:
c     b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 12461 -12462  12463 -924 1162 0


c  2-1 --> 1
c    (-b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧ -p_924) -> (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0)
c  in CNF:
c     b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_2
c     b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_1
c     b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨  b^{14, 67}_0
c  in DIMACS:
 12461 -12462  12463  924 -12464 0
 12461 -12462  12463  924 -12465 0
 12461 -12462  12463  924  12466 0

c  1-1 --> 0
c    (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0 ∧ -p_924) -> (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧ -b^{14, 67}_0)
c  in CNF:
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_2
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_1
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_0
c  in DIMACS:
 12461  12462 -12463  924 -12464 0
 12461  12462 -12463  924 -12465 0
 12461  12462 -12463  924 -12466 0

c  0-1 --> -1
c    (-b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧ -p_924) -> ( b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0)
c  in CNF:
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨  b^{14, 67}_2
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_1
c     b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨  b^{14, 67}_0
c  in DIMACS:
 12461  12462  12463  924  12464 0
 12461  12462  12463  924 -12465 0
 12461  12462  12463  924  12466 0

c  -1-1 --> -2
c    ( b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧  b^{14, 66}_0 ∧ -p_924) -> ( b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0)
c  in CNF:
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨  b^{14, 67}_2
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨  b^{14, 67}_1
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨  p_924 ∨ -b^{14, 67}_0
c  in DIMACS:
-12461  12462 -12463  924  12464 0
-12461  12462 -12463  924  12465 0
-12461  12462 -12463  924 -12466 0

c  -2-1 --> break 
c    ( b^{14, 66}_2 ∧  b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨  b^{14, 66}_0 ∨  p_924 ∨ break
c  in DIMACS:
-12461 -12462  12463  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 66}_2 ∧ -b^{14, 66}_1 ∧ -b^{14, 66}_0 ∧ true) 
c  in CNF:
c    -b^{14, 66}_2 ∨  b^{14, 66}_1 ∨  b^{14, 66}_0 ∨ false 
c  in DIMACS:
-12461  12462  12463  0

c  3 does not represent an automaton state.
c    -(-b^{14, 66}_2 ∧  b^{14, 66}_1 ∧  b^{14, 66}_0 ∧ true) 
c  in CNF:
c     b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ false 
c  in DIMACS:
 12461 -12462 -12463  0
c  -3 does not represent an automaton state.
c    -( b^{14, 66}_2 ∧  b^{14, 66}_1 ∧  b^{14, 66}_0 ∧ true) 
c  in CNF:
c    -b^{14, 66}_2 ∨ -b^{14, 66}_1 ∨ -b^{14, 66}_0 ∨ false 
c  in DIMACS:
-12461 -12462 -12463  0

c i = 67
c  -2+1 --> -1
c    ( b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧  p_938) -> ( b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0)
c  in CNF:
c    -b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨  b^{14, 68}_2
c    -b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_1
c    -b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨  b^{14, 68}_0
c  in DIMACS:
-12464 -12465  12466 -938  12467 0
-12464 -12465  12466 -938 -12468 0
-12464 -12465  12466 -938  12469 0

c  -1+1 --> 0
c    ( b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0 ∧  p_938) -> (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧ -b^{14, 68}_0)
c  in CNF:
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_2
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_1
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_0
c  in DIMACS:
-12464  12465 -12466 -938 -12467 0
-12464  12465 -12466 -938 -12468 0
-12464  12465 -12466 -938 -12469 0

c  0+1 --> 1
c    (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧  p_938) -> (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0)
c  in CNF:
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_2
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_1
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨  b^{14, 68}_0
c  in DIMACS:
 12464  12465  12466 -938 -12467 0
 12464  12465  12466 -938 -12468 0
 12464  12465  12466 -938  12469 0

c  1+1 --> 2
c    (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0 ∧  p_938) -> (-b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0)
c  in CNF:
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_2
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨  b^{14, 68}_1
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ -p_938 ∨ -b^{14, 68}_0
c  in DIMACS:
 12464  12465 -12466 -938 -12467 0
 12464  12465 -12466 -938  12468 0
 12464  12465 -12466 -938 -12469 0

c  2+1 --> break 
c    (-b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧  p_938) -> break
c  in CNF:
c     b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 12464 -12465  12466 -938 1162 0


c  2-1 --> 1
c    (-b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧ -p_938) -> (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0)
c  in CNF:
c     b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_2
c     b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_1
c     b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨  b^{14, 68}_0
c  in DIMACS:
 12464 -12465  12466  938 -12467 0
 12464 -12465  12466  938 -12468 0
 12464 -12465  12466  938  12469 0

c  1-1 --> 0
c    (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0 ∧ -p_938) -> (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧ -b^{14, 68}_0)
c  in CNF:
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_2
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_1
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_0
c  in DIMACS:
 12464  12465 -12466  938 -12467 0
 12464  12465 -12466  938 -12468 0
 12464  12465 -12466  938 -12469 0

c  0-1 --> -1
c    (-b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧ -p_938) -> ( b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0)
c  in CNF:
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨  b^{14, 68}_2
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_1
c     b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨  b^{14, 68}_0
c  in DIMACS:
 12464  12465  12466  938  12467 0
 12464  12465  12466  938 -12468 0
 12464  12465  12466  938  12469 0

c  -1-1 --> -2
c    ( b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧  b^{14, 67}_0 ∧ -p_938) -> ( b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0)
c  in CNF:
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨  b^{14, 68}_2
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨  b^{14, 68}_1
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨  p_938 ∨ -b^{14, 68}_0
c  in DIMACS:
-12464  12465 -12466  938  12467 0
-12464  12465 -12466  938  12468 0
-12464  12465 -12466  938 -12469 0

c  -2-1 --> break 
c    ( b^{14, 67}_2 ∧  b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨  b^{14, 67}_0 ∨  p_938 ∨ break
c  in DIMACS:
-12464 -12465  12466  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 67}_2 ∧ -b^{14, 67}_1 ∧ -b^{14, 67}_0 ∧ true) 
c  in CNF:
c    -b^{14, 67}_2 ∨  b^{14, 67}_1 ∨  b^{14, 67}_0 ∨ false 
c  in DIMACS:
-12464  12465  12466  0

c  3 does not represent an automaton state.
c    -(-b^{14, 67}_2 ∧  b^{14, 67}_1 ∧  b^{14, 67}_0 ∧ true) 
c  in CNF:
c     b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ false 
c  in DIMACS:
 12464 -12465 -12466  0
c  -3 does not represent an automaton state.
c    -( b^{14, 67}_2 ∧  b^{14, 67}_1 ∧  b^{14, 67}_0 ∧ true) 
c  in CNF:
c    -b^{14, 67}_2 ∨ -b^{14, 67}_1 ∨ -b^{14, 67}_0 ∨ false 
c  in DIMACS:
-12464 -12465 -12466  0

c i = 68
c  -2+1 --> -1
c    ( b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧  p_952) -> ( b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0)
c  in CNF:
c    -b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨  b^{14, 69}_2
c    -b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_1
c    -b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨  b^{14, 69}_0
c  in DIMACS:
-12467 -12468  12469 -952  12470 0
-12467 -12468  12469 -952 -12471 0
-12467 -12468  12469 -952  12472 0

c  -1+1 --> 0
c    ( b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0 ∧  p_952) -> (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧ -b^{14, 69}_0)
c  in CNF:
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_2
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_1
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_0
c  in DIMACS:
-12467  12468 -12469 -952 -12470 0
-12467  12468 -12469 -952 -12471 0
-12467  12468 -12469 -952 -12472 0

c  0+1 --> 1
c    (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧  p_952) -> (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0)
c  in CNF:
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_2
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_1
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨  b^{14, 69}_0
c  in DIMACS:
 12467  12468  12469 -952 -12470 0
 12467  12468  12469 -952 -12471 0
 12467  12468  12469 -952  12472 0

c  1+1 --> 2
c    (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0 ∧  p_952) -> (-b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0)
c  in CNF:
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_2
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨  b^{14, 69}_1
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ -p_952 ∨ -b^{14, 69}_0
c  in DIMACS:
 12467  12468 -12469 -952 -12470 0
 12467  12468 -12469 -952  12471 0
 12467  12468 -12469 -952 -12472 0

c  2+1 --> break 
c    (-b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧  p_952) -> break
c  in CNF:
c     b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 12467 -12468  12469 -952 1162 0


c  2-1 --> 1
c    (-b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧ -p_952) -> (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0)
c  in CNF:
c     b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_2
c     b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_1
c     b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨  b^{14, 69}_0
c  in DIMACS:
 12467 -12468  12469  952 -12470 0
 12467 -12468  12469  952 -12471 0
 12467 -12468  12469  952  12472 0

c  1-1 --> 0
c    (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0 ∧ -p_952) -> (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧ -b^{14, 69}_0)
c  in CNF:
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_2
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_1
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_0
c  in DIMACS:
 12467  12468 -12469  952 -12470 0
 12467  12468 -12469  952 -12471 0
 12467  12468 -12469  952 -12472 0

c  0-1 --> -1
c    (-b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧ -p_952) -> ( b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0)
c  in CNF:
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨  b^{14, 69}_2
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_1
c     b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨  b^{14, 69}_0
c  in DIMACS:
 12467  12468  12469  952  12470 0
 12467  12468  12469  952 -12471 0
 12467  12468  12469  952  12472 0

c  -1-1 --> -2
c    ( b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧  b^{14, 68}_0 ∧ -p_952) -> ( b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0)
c  in CNF:
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨  b^{14, 69}_2
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨  b^{14, 69}_1
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨  p_952 ∨ -b^{14, 69}_0
c  in DIMACS:
-12467  12468 -12469  952  12470 0
-12467  12468 -12469  952  12471 0
-12467  12468 -12469  952 -12472 0

c  -2-1 --> break 
c    ( b^{14, 68}_2 ∧  b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨  b^{14, 68}_0 ∨  p_952 ∨ break
c  in DIMACS:
-12467 -12468  12469  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 68}_2 ∧ -b^{14, 68}_1 ∧ -b^{14, 68}_0 ∧ true) 
c  in CNF:
c    -b^{14, 68}_2 ∨  b^{14, 68}_1 ∨  b^{14, 68}_0 ∨ false 
c  in DIMACS:
-12467  12468  12469  0

c  3 does not represent an automaton state.
c    -(-b^{14, 68}_2 ∧  b^{14, 68}_1 ∧  b^{14, 68}_0 ∧ true) 
c  in CNF:
c     b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ false 
c  in DIMACS:
 12467 -12468 -12469  0
c  -3 does not represent an automaton state.
c    -( b^{14, 68}_2 ∧  b^{14, 68}_1 ∧  b^{14, 68}_0 ∧ true) 
c  in CNF:
c    -b^{14, 68}_2 ∨ -b^{14, 68}_1 ∨ -b^{14, 68}_0 ∨ false 
c  in DIMACS:
-12467 -12468 -12469  0

c i = 69
c  -2+1 --> -1
c    ( b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧  p_966) -> ( b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0)
c  in CNF:
c    -b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨  b^{14, 70}_2
c    -b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_1
c    -b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨  b^{14, 70}_0
c  in DIMACS:
-12470 -12471  12472 -966  12473 0
-12470 -12471  12472 -966 -12474 0
-12470 -12471  12472 -966  12475 0

c  -1+1 --> 0
c    ( b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0 ∧  p_966) -> (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧ -b^{14, 70}_0)
c  in CNF:
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_2
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_1
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_0
c  in DIMACS:
-12470  12471 -12472 -966 -12473 0
-12470  12471 -12472 -966 -12474 0
-12470  12471 -12472 -966 -12475 0

c  0+1 --> 1
c    (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧  p_966) -> (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0)
c  in CNF:
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_2
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_1
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨  b^{14, 70}_0
c  in DIMACS:
 12470  12471  12472 -966 -12473 0
 12470  12471  12472 -966 -12474 0
 12470  12471  12472 -966  12475 0

c  1+1 --> 2
c    (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0 ∧  p_966) -> (-b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0)
c  in CNF:
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_2
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨  b^{14, 70}_1
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ -p_966 ∨ -b^{14, 70}_0
c  in DIMACS:
 12470  12471 -12472 -966 -12473 0
 12470  12471 -12472 -966  12474 0
 12470  12471 -12472 -966 -12475 0

c  2+1 --> break 
c    (-b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧  p_966) -> break
c  in CNF:
c     b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 12470 -12471  12472 -966 1162 0


c  2-1 --> 1
c    (-b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧ -p_966) -> (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0)
c  in CNF:
c     b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_2
c     b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_1
c     b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨  b^{14, 70}_0
c  in DIMACS:
 12470 -12471  12472  966 -12473 0
 12470 -12471  12472  966 -12474 0
 12470 -12471  12472  966  12475 0

c  1-1 --> 0
c    (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0 ∧ -p_966) -> (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧ -b^{14, 70}_0)
c  in CNF:
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_2
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_1
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_0
c  in DIMACS:
 12470  12471 -12472  966 -12473 0
 12470  12471 -12472  966 -12474 0
 12470  12471 -12472  966 -12475 0

c  0-1 --> -1
c    (-b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧ -p_966) -> ( b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0)
c  in CNF:
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨  b^{14, 70}_2
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_1
c     b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨  b^{14, 70}_0
c  in DIMACS:
 12470  12471  12472  966  12473 0
 12470  12471  12472  966 -12474 0
 12470  12471  12472  966  12475 0

c  -1-1 --> -2
c    ( b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧  b^{14, 69}_0 ∧ -p_966) -> ( b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0)
c  in CNF:
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨  b^{14, 70}_2
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨  b^{14, 70}_1
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨  p_966 ∨ -b^{14, 70}_0
c  in DIMACS:
-12470  12471 -12472  966  12473 0
-12470  12471 -12472  966  12474 0
-12470  12471 -12472  966 -12475 0

c  -2-1 --> break 
c    ( b^{14, 69}_2 ∧  b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨  b^{14, 69}_0 ∨  p_966 ∨ break
c  in DIMACS:
-12470 -12471  12472  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 69}_2 ∧ -b^{14, 69}_1 ∧ -b^{14, 69}_0 ∧ true) 
c  in CNF:
c    -b^{14, 69}_2 ∨  b^{14, 69}_1 ∨  b^{14, 69}_0 ∨ false 
c  in DIMACS:
-12470  12471  12472  0

c  3 does not represent an automaton state.
c    -(-b^{14, 69}_2 ∧  b^{14, 69}_1 ∧  b^{14, 69}_0 ∧ true) 
c  in CNF:
c     b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ false 
c  in DIMACS:
 12470 -12471 -12472  0
c  -3 does not represent an automaton state.
c    -( b^{14, 69}_2 ∧  b^{14, 69}_1 ∧  b^{14, 69}_0 ∧ true) 
c  in CNF:
c    -b^{14, 69}_2 ∨ -b^{14, 69}_1 ∨ -b^{14, 69}_0 ∨ false 
c  in DIMACS:
-12470 -12471 -12472  0

c i = 70
c  -2+1 --> -1
c    ( b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧  p_980) -> ( b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0)
c  in CNF:
c    -b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨  b^{14, 71}_2
c    -b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_1
c    -b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨  b^{14, 71}_0
c  in DIMACS:
-12473 -12474  12475 -980  12476 0
-12473 -12474  12475 -980 -12477 0
-12473 -12474  12475 -980  12478 0

c  -1+1 --> 0
c    ( b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0 ∧  p_980) -> (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧ -b^{14, 71}_0)
c  in CNF:
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_2
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_1
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_0
c  in DIMACS:
-12473  12474 -12475 -980 -12476 0
-12473  12474 -12475 -980 -12477 0
-12473  12474 -12475 -980 -12478 0

c  0+1 --> 1
c    (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧  p_980) -> (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0)
c  in CNF:
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_2
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_1
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨  b^{14, 71}_0
c  in DIMACS:
 12473  12474  12475 -980 -12476 0
 12473  12474  12475 -980 -12477 0
 12473  12474  12475 -980  12478 0

c  1+1 --> 2
c    (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0 ∧  p_980) -> (-b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0)
c  in CNF:
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_2
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨  b^{14, 71}_1
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ -p_980 ∨ -b^{14, 71}_0
c  in DIMACS:
 12473  12474 -12475 -980 -12476 0
 12473  12474 -12475 -980  12477 0
 12473  12474 -12475 -980 -12478 0

c  2+1 --> break 
c    (-b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧  p_980) -> break
c  in CNF:
c     b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 12473 -12474  12475 -980 1162 0


c  2-1 --> 1
c    (-b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧ -p_980) -> (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0)
c  in CNF:
c     b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_2
c     b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_1
c     b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨  b^{14, 71}_0
c  in DIMACS:
 12473 -12474  12475  980 -12476 0
 12473 -12474  12475  980 -12477 0
 12473 -12474  12475  980  12478 0

c  1-1 --> 0
c    (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0 ∧ -p_980) -> (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧ -b^{14, 71}_0)
c  in CNF:
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_2
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_1
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_0
c  in DIMACS:
 12473  12474 -12475  980 -12476 0
 12473  12474 -12475  980 -12477 0
 12473  12474 -12475  980 -12478 0

c  0-1 --> -1
c    (-b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧ -p_980) -> ( b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0)
c  in CNF:
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨  b^{14, 71}_2
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_1
c     b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨  b^{14, 71}_0
c  in DIMACS:
 12473  12474  12475  980  12476 0
 12473  12474  12475  980 -12477 0
 12473  12474  12475  980  12478 0

c  -1-1 --> -2
c    ( b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧  b^{14, 70}_0 ∧ -p_980) -> ( b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0)
c  in CNF:
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨  b^{14, 71}_2
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨  b^{14, 71}_1
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨  p_980 ∨ -b^{14, 71}_0
c  in DIMACS:
-12473  12474 -12475  980  12476 0
-12473  12474 -12475  980  12477 0
-12473  12474 -12475  980 -12478 0

c  -2-1 --> break 
c    ( b^{14, 70}_2 ∧  b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨  b^{14, 70}_0 ∨  p_980 ∨ break
c  in DIMACS:
-12473 -12474  12475  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 70}_2 ∧ -b^{14, 70}_1 ∧ -b^{14, 70}_0 ∧ true) 
c  in CNF:
c    -b^{14, 70}_2 ∨  b^{14, 70}_1 ∨  b^{14, 70}_0 ∨ false 
c  in DIMACS:
-12473  12474  12475  0

c  3 does not represent an automaton state.
c    -(-b^{14, 70}_2 ∧  b^{14, 70}_1 ∧  b^{14, 70}_0 ∧ true) 
c  in CNF:
c     b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ false 
c  in DIMACS:
 12473 -12474 -12475  0
c  -3 does not represent an automaton state.
c    -( b^{14, 70}_2 ∧  b^{14, 70}_1 ∧  b^{14, 70}_0 ∧ true) 
c  in CNF:
c    -b^{14, 70}_2 ∨ -b^{14, 70}_1 ∨ -b^{14, 70}_0 ∨ false 
c  in DIMACS:
-12473 -12474 -12475  0

c i = 71
c  -2+1 --> -1
c    ( b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧  p_994) -> ( b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0)
c  in CNF:
c    -b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨  b^{14, 72}_2
c    -b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_1
c    -b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨  b^{14, 72}_0
c  in DIMACS:
-12476 -12477  12478 -994  12479 0
-12476 -12477  12478 -994 -12480 0
-12476 -12477  12478 -994  12481 0

c  -1+1 --> 0
c    ( b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0 ∧  p_994) -> (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧ -b^{14, 72}_0)
c  in CNF:
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_2
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_1
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_0
c  in DIMACS:
-12476  12477 -12478 -994 -12479 0
-12476  12477 -12478 -994 -12480 0
-12476  12477 -12478 -994 -12481 0

c  0+1 --> 1
c    (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧  p_994) -> (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0)
c  in CNF:
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_2
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_1
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨  b^{14, 72}_0
c  in DIMACS:
 12476  12477  12478 -994 -12479 0
 12476  12477  12478 -994 -12480 0
 12476  12477  12478 -994  12481 0

c  1+1 --> 2
c    (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0 ∧  p_994) -> (-b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0)
c  in CNF:
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_2
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨  b^{14, 72}_1
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ -p_994 ∨ -b^{14, 72}_0
c  in DIMACS:
 12476  12477 -12478 -994 -12479 0
 12476  12477 -12478 -994  12480 0
 12476  12477 -12478 -994 -12481 0

c  2+1 --> break 
c    (-b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧  p_994) -> break
c  in CNF:
c     b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 12476 -12477  12478 -994 1162 0


c  2-1 --> 1
c    (-b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧ -p_994) -> (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0)
c  in CNF:
c     b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_2
c     b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_1
c     b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨  b^{14, 72}_0
c  in DIMACS:
 12476 -12477  12478  994 -12479 0
 12476 -12477  12478  994 -12480 0
 12476 -12477  12478  994  12481 0

c  1-1 --> 0
c    (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0 ∧ -p_994) -> (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧ -b^{14, 72}_0)
c  in CNF:
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_2
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_1
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_0
c  in DIMACS:
 12476  12477 -12478  994 -12479 0
 12476  12477 -12478  994 -12480 0
 12476  12477 -12478  994 -12481 0

c  0-1 --> -1
c    (-b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧ -p_994) -> ( b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0)
c  in CNF:
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨  b^{14, 72}_2
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_1
c     b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨  b^{14, 72}_0
c  in DIMACS:
 12476  12477  12478  994  12479 0
 12476  12477  12478  994 -12480 0
 12476  12477  12478  994  12481 0

c  -1-1 --> -2
c    ( b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧  b^{14, 71}_0 ∧ -p_994) -> ( b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0)
c  in CNF:
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨  b^{14, 72}_2
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨  b^{14, 72}_1
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨  p_994 ∨ -b^{14, 72}_0
c  in DIMACS:
-12476  12477 -12478  994  12479 0
-12476  12477 -12478  994  12480 0
-12476  12477 -12478  994 -12481 0

c  -2-1 --> break 
c    ( b^{14, 71}_2 ∧  b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨  b^{14, 71}_0 ∨  p_994 ∨ break
c  in DIMACS:
-12476 -12477  12478  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 71}_2 ∧ -b^{14, 71}_1 ∧ -b^{14, 71}_0 ∧ true) 
c  in CNF:
c    -b^{14, 71}_2 ∨  b^{14, 71}_1 ∨  b^{14, 71}_0 ∨ false 
c  in DIMACS:
-12476  12477  12478  0

c  3 does not represent an automaton state.
c    -(-b^{14, 71}_2 ∧  b^{14, 71}_1 ∧  b^{14, 71}_0 ∧ true) 
c  in CNF:
c     b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ false 
c  in DIMACS:
 12476 -12477 -12478  0
c  -3 does not represent an automaton state.
c    -( b^{14, 71}_2 ∧  b^{14, 71}_1 ∧  b^{14, 71}_0 ∧ true) 
c  in CNF:
c    -b^{14, 71}_2 ∨ -b^{14, 71}_1 ∨ -b^{14, 71}_0 ∨ false 
c  in DIMACS:
-12476 -12477 -12478  0

c i = 72
c  -2+1 --> -1
c    ( b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧  p_1008) -> ( b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0)
c  in CNF:
c    -b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨  b^{14, 73}_2
c    -b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_1
c    -b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨  b^{14, 73}_0
c  in DIMACS:
-12479 -12480  12481 -1008  12482 0
-12479 -12480  12481 -1008 -12483 0
-12479 -12480  12481 -1008  12484 0

c  -1+1 --> 0
c    ( b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0 ∧  p_1008) -> (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧ -b^{14, 73}_0)
c  in CNF:
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_2
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_1
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_0
c  in DIMACS:
-12479  12480 -12481 -1008 -12482 0
-12479  12480 -12481 -1008 -12483 0
-12479  12480 -12481 -1008 -12484 0

c  0+1 --> 1
c    (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧  p_1008) -> (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0)
c  in CNF:
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_2
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_1
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨  b^{14, 73}_0
c  in DIMACS:
 12479  12480  12481 -1008 -12482 0
 12479  12480  12481 -1008 -12483 0
 12479  12480  12481 -1008  12484 0

c  1+1 --> 2
c    (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0 ∧  p_1008) -> (-b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0)
c  in CNF:
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_2
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨  b^{14, 73}_1
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ -p_1008 ∨ -b^{14, 73}_0
c  in DIMACS:
 12479  12480 -12481 -1008 -12482 0
 12479  12480 -12481 -1008  12483 0
 12479  12480 -12481 -1008 -12484 0

c  2+1 --> break 
c    (-b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 12479 -12480  12481 -1008 1162 0


c  2-1 --> 1
c    (-b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧ -p_1008) -> (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0)
c  in CNF:
c     b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_2
c     b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_1
c     b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨  b^{14, 73}_0
c  in DIMACS:
 12479 -12480  12481  1008 -12482 0
 12479 -12480  12481  1008 -12483 0
 12479 -12480  12481  1008  12484 0

c  1-1 --> 0
c    (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0 ∧ -p_1008) -> (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧ -b^{14, 73}_0)
c  in CNF:
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_2
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_1
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_0
c  in DIMACS:
 12479  12480 -12481  1008 -12482 0
 12479  12480 -12481  1008 -12483 0
 12479  12480 -12481  1008 -12484 0

c  0-1 --> -1
c    (-b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧ -p_1008) -> ( b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0)
c  in CNF:
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨  b^{14, 73}_2
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_1
c     b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨  b^{14, 73}_0
c  in DIMACS:
 12479  12480  12481  1008  12482 0
 12479  12480  12481  1008 -12483 0
 12479  12480  12481  1008  12484 0

c  -1-1 --> -2
c    ( b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧  b^{14, 72}_0 ∧ -p_1008) -> ( b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0)
c  in CNF:
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨  b^{14, 73}_2
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨  b^{14, 73}_1
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨  p_1008 ∨ -b^{14, 73}_0
c  in DIMACS:
-12479  12480 -12481  1008  12482 0
-12479  12480 -12481  1008  12483 0
-12479  12480 -12481  1008 -12484 0

c  -2-1 --> break 
c    ( b^{14, 72}_2 ∧  b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨  b^{14, 72}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-12479 -12480  12481  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 72}_2 ∧ -b^{14, 72}_1 ∧ -b^{14, 72}_0 ∧ true) 
c  in CNF:
c    -b^{14, 72}_2 ∨  b^{14, 72}_1 ∨  b^{14, 72}_0 ∨ false 
c  in DIMACS:
-12479  12480  12481  0

c  3 does not represent an automaton state.
c    -(-b^{14, 72}_2 ∧  b^{14, 72}_1 ∧  b^{14, 72}_0 ∧ true) 
c  in CNF:
c     b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ false 
c  in DIMACS:
 12479 -12480 -12481  0
c  -3 does not represent an automaton state.
c    -( b^{14, 72}_2 ∧  b^{14, 72}_1 ∧  b^{14, 72}_0 ∧ true) 
c  in CNF:
c    -b^{14, 72}_2 ∨ -b^{14, 72}_1 ∨ -b^{14, 72}_0 ∨ false 
c  in DIMACS:
-12479 -12480 -12481  0

c i = 73
c  -2+1 --> -1
c    ( b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧  p_1022) -> ( b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0)
c  in CNF:
c    -b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨  b^{14, 74}_2
c    -b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_1
c    -b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨  b^{14, 74}_0
c  in DIMACS:
-12482 -12483  12484 -1022  12485 0
-12482 -12483  12484 -1022 -12486 0
-12482 -12483  12484 -1022  12487 0

c  -1+1 --> 0
c    ( b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0 ∧  p_1022) -> (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧ -b^{14, 74}_0)
c  in CNF:
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_2
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_1
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_0
c  in DIMACS:
-12482  12483 -12484 -1022 -12485 0
-12482  12483 -12484 -1022 -12486 0
-12482  12483 -12484 -1022 -12487 0

c  0+1 --> 1
c    (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧  p_1022) -> (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0)
c  in CNF:
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_2
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_1
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨  b^{14, 74}_0
c  in DIMACS:
 12482  12483  12484 -1022 -12485 0
 12482  12483  12484 -1022 -12486 0
 12482  12483  12484 -1022  12487 0

c  1+1 --> 2
c    (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0 ∧  p_1022) -> (-b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0)
c  in CNF:
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_2
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨  b^{14, 74}_1
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ -p_1022 ∨ -b^{14, 74}_0
c  in DIMACS:
 12482  12483 -12484 -1022 -12485 0
 12482  12483 -12484 -1022  12486 0
 12482  12483 -12484 -1022 -12487 0

c  2+1 --> break 
c    (-b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 12482 -12483  12484 -1022 1162 0


c  2-1 --> 1
c    (-b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧ -p_1022) -> (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0)
c  in CNF:
c     b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_2
c     b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_1
c     b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨  b^{14, 74}_0
c  in DIMACS:
 12482 -12483  12484  1022 -12485 0
 12482 -12483  12484  1022 -12486 0
 12482 -12483  12484  1022  12487 0

c  1-1 --> 0
c    (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0 ∧ -p_1022) -> (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧ -b^{14, 74}_0)
c  in CNF:
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_2
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_1
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_0
c  in DIMACS:
 12482  12483 -12484  1022 -12485 0
 12482  12483 -12484  1022 -12486 0
 12482  12483 -12484  1022 -12487 0

c  0-1 --> -1
c    (-b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧ -p_1022) -> ( b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0)
c  in CNF:
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨  b^{14, 74}_2
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_1
c     b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨  b^{14, 74}_0
c  in DIMACS:
 12482  12483  12484  1022  12485 0
 12482  12483  12484  1022 -12486 0
 12482  12483  12484  1022  12487 0

c  -1-1 --> -2
c    ( b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧  b^{14, 73}_0 ∧ -p_1022) -> ( b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0)
c  in CNF:
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨  b^{14, 74}_2
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨  b^{14, 74}_1
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨  p_1022 ∨ -b^{14, 74}_0
c  in DIMACS:
-12482  12483 -12484  1022  12485 0
-12482  12483 -12484  1022  12486 0
-12482  12483 -12484  1022 -12487 0

c  -2-1 --> break 
c    ( b^{14, 73}_2 ∧  b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨  b^{14, 73}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-12482 -12483  12484  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 73}_2 ∧ -b^{14, 73}_1 ∧ -b^{14, 73}_0 ∧ true) 
c  in CNF:
c    -b^{14, 73}_2 ∨  b^{14, 73}_1 ∨  b^{14, 73}_0 ∨ false 
c  in DIMACS:
-12482  12483  12484  0

c  3 does not represent an automaton state.
c    -(-b^{14, 73}_2 ∧  b^{14, 73}_1 ∧  b^{14, 73}_0 ∧ true) 
c  in CNF:
c     b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ false 
c  in DIMACS:
 12482 -12483 -12484  0
c  -3 does not represent an automaton state.
c    -( b^{14, 73}_2 ∧  b^{14, 73}_1 ∧  b^{14, 73}_0 ∧ true) 
c  in CNF:
c    -b^{14, 73}_2 ∨ -b^{14, 73}_1 ∨ -b^{14, 73}_0 ∨ false 
c  in DIMACS:
-12482 -12483 -12484  0

c i = 74
c  -2+1 --> -1
c    ( b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧  p_1036) -> ( b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0)
c  in CNF:
c    -b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨  b^{14, 75}_2
c    -b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_1
c    -b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨  b^{14, 75}_0
c  in DIMACS:
-12485 -12486  12487 -1036  12488 0
-12485 -12486  12487 -1036 -12489 0
-12485 -12486  12487 -1036  12490 0

c  -1+1 --> 0
c    ( b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0 ∧  p_1036) -> (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧ -b^{14, 75}_0)
c  in CNF:
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_2
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_1
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_0
c  in DIMACS:
-12485  12486 -12487 -1036 -12488 0
-12485  12486 -12487 -1036 -12489 0
-12485  12486 -12487 -1036 -12490 0

c  0+1 --> 1
c    (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧  p_1036) -> (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0)
c  in CNF:
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_2
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_1
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨  b^{14, 75}_0
c  in DIMACS:
 12485  12486  12487 -1036 -12488 0
 12485  12486  12487 -1036 -12489 0
 12485  12486  12487 -1036  12490 0

c  1+1 --> 2
c    (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0 ∧  p_1036) -> (-b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0)
c  in CNF:
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_2
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨  b^{14, 75}_1
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ -p_1036 ∨ -b^{14, 75}_0
c  in DIMACS:
 12485  12486 -12487 -1036 -12488 0
 12485  12486 -12487 -1036  12489 0
 12485  12486 -12487 -1036 -12490 0

c  2+1 --> break 
c    (-b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 12485 -12486  12487 -1036 1162 0


c  2-1 --> 1
c    (-b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧ -p_1036) -> (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0)
c  in CNF:
c     b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_2
c     b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_1
c     b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨  b^{14, 75}_0
c  in DIMACS:
 12485 -12486  12487  1036 -12488 0
 12485 -12486  12487  1036 -12489 0
 12485 -12486  12487  1036  12490 0

c  1-1 --> 0
c    (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0 ∧ -p_1036) -> (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧ -b^{14, 75}_0)
c  in CNF:
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_2
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_1
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_0
c  in DIMACS:
 12485  12486 -12487  1036 -12488 0
 12485  12486 -12487  1036 -12489 0
 12485  12486 -12487  1036 -12490 0

c  0-1 --> -1
c    (-b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧ -p_1036) -> ( b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0)
c  in CNF:
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨  b^{14, 75}_2
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_1
c     b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨  b^{14, 75}_0
c  in DIMACS:
 12485  12486  12487  1036  12488 0
 12485  12486  12487  1036 -12489 0
 12485  12486  12487  1036  12490 0

c  -1-1 --> -2
c    ( b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧  b^{14, 74}_0 ∧ -p_1036) -> ( b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0)
c  in CNF:
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨  b^{14, 75}_2
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨  b^{14, 75}_1
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨  p_1036 ∨ -b^{14, 75}_0
c  in DIMACS:
-12485  12486 -12487  1036  12488 0
-12485  12486 -12487  1036  12489 0
-12485  12486 -12487  1036 -12490 0

c  -2-1 --> break 
c    ( b^{14, 74}_2 ∧  b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨  b^{14, 74}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-12485 -12486  12487  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 74}_2 ∧ -b^{14, 74}_1 ∧ -b^{14, 74}_0 ∧ true) 
c  in CNF:
c    -b^{14, 74}_2 ∨  b^{14, 74}_1 ∨  b^{14, 74}_0 ∨ false 
c  in DIMACS:
-12485  12486  12487  0

c  3 does not represent an automaton state.
c    -(-b^{14, 74}_2 ∧  b^{14, 74}_1 ∧  b^{14, 74}_0 ∧ true) 
c  in CNF:
c     b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ false 
c  in DIMACS:
 12485 -12486 -12487  0
c  -3 does not represent an automaton state.
c    -( b^{14, 74}_2 ∧  b^{14, 74}_1 ∧  b^{14, 74}_0 ∧ true) 
c  in CNF:
c    -b^{14, 74}_2 ∨ -b^{14, 74}_1 ∨ -b^{14, 74}_0 ∨ false 
c  in DIMACS:
-12485 -12486 -12487  0

c i = 75
c  -2+1 --> -1
c    ( b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧  p_1050) -> ( b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0)
c  in CNF:
c    -b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨  b^{14, 76}_2
c    -b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_1
c    -b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨  b^{14, 76}_0
c  in DIMACS:
-12488 -12489  12490 -1050  12491 0
-12488 -12489  12490 -1050 -12492 0
-12488 -12489  12490 -1050  12493 0

c  -1+1 --> 0
c    ( b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0 ∧  p_1050) -> (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧ -b^{14, 76}_0)
c  in CNF:
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_2
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_1
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_0
c  in DIMACS:
-12488  12489 -12490 -1050 -12491 0
-12488  12489 -12490 -1050 -12492 0
-12488  12489 -12490 -1050 -12493 0

c  0+1 --> 1
c    (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧  p_1050) -> (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0)
c  in CNF:
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_2
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_1
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨  b^{14, 76}_0
c  in DIMACS:
 12488  12489  12490 -1050 -12491 0
 12488  12489  12490 -1050 -12492 0
 12488  12489  12490 -1050  12493 0

c  1+1 --> 2
c    (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0 ∧  p_1050) -> (-b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0)
c  in CNF:
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_2
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨  b^{14, 76}_1
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ -p_1050 ∨ -b^{14, 76}_0
c  in DIMACS:
 12488  12489 -12490 -1050 -12491 0
 12488  12489 -12490 -1050  12492 0
 12488  12489 -12490 -1050 -12493 0

c  2+1 --> break 
c    (-b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 12488 -12489  12490 -1050 1162 0


c  2-1 --> 1
c    (-b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧ -p_1050) -> (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0)
c  in CNF:
c     b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_2
c     b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_1
c     b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨  b^{14, 76}_0
c  in DIMACS:
 12488 -12489  12490  1050 -12491 0
 12488 -12489  12490  1050 -12492 0
 12488 -12489  12490  1050  12493 0

c  1-1 --> 0
c    (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0 ∧ -p_1050) -> (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧ -b^{14, 76}_0)
c  in CNF:
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_2
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_1
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_0
c  in DIMACS:
 12488  12489 -12490  1050 -12491 0
 12488  12489 -12490  1050 -12492 0
 12488  12489 -12490  1050 -12493 0

c  0-1 --> -1
c    (-b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧ -p_1050) -> ( b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0)
c  in CNF:
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨  b^{14, 76}_2
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_1
c     b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨  b^{14, 76}_0
c  in DIMACS:
 12488  12489  12490  1050  12491 0
 12488  12489  12490  1050 -12492 0
 12488  12489  12490  1050  12493 0

c  -1-1 --> -2
c    ( b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧  b^{14, 75}_0 ∧ -p_1050) -> ( b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0)
c  in CNF:
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨  b^{14, 76}_2
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨  b^{14, 76}_1
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨  p_1050 ∨ -b^{14, 76}_0
c  in DIMACS:
-12488  12489 -12490  1050  12491 0
-12488  12489 -12490  1050  12492 0
-12488  12489 -12490  1050 -12493 0

c  -2-1 --> break 
c    ( b^{14, 75}_2 ∧  b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨  b^{14, 75}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-12488 -12489  12490  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 75}_2 ∧ -b^{14, 75}_1 ∧ -b^{14, 75}_0 ∧ true) 
c  in CNF:
c    -b^{14, 75}_2 ∨  b^{14, 75}_1 ∨  b^{14, 75}_0 ∨ false 
c  in DIMACS:
-12488  12489  12490  0

c  3 does not represent an automaton state.
c    -(-b^{14, 75}_2 ∧  b^{14, 75}_1 ∧  b^{14, 75}_0 ∧ true) 
c  in CNF:
c     b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ false 
c  in DIMACS:
 12488 -12489 -12490  0
c  -3 does not represent an automaton state.
c    -( b^{14, 75}_2 ∧  b^{14, 75}_1 ∧  b^{14, 75}_0 ∧ true) 
c  in CNF:
c    -b^{14, 75}_2 ∨ -b^{14, 75}_1 ∨ -b^{14, 75}_0 ∨ false 
c  in DIMACS:
-12488 -12489 -12490  0

c i = 76
c  -2+1 --> -1
c    ( b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧  p_1064) -> ( b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0)
c  in CNF:
c    -b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨  b^{14, 77}_2
c    -b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_1
c    -b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨  b^{14, 77}_0
c  in DIMACS:
-12491 -12492  12493 -1064  12494 0
-12491 -12492  12493 -1064 -12495 0
-12491 -12492  12493 -1064  12496 0

c  -1+1 --> 0
c    ( b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0 ∧  p_1064) -> (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧ -b^{14, 77}_0)
c  in CNF:
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_2
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_1
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_0
c  in DIMACS:
-12491  12492 -12493 -1064 -12494 0
-12491  12492 -12493 -1064 -12495 0
-12491  12492 -12493 -1064 -12496 0

c  0+1 --> 1
c    (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧  p_1064) -> (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0)
c  in CNF:
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_2
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_1
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨  b^{14, 77}_0
c  in DIMACS:
 12491  12492  12493 -1064 -12494 0
 12491  12492  12493 -1064 -12495 0
 12491  12492  12493 -1064  12496 0

c  1+1 --> 2
c    (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0 ∧  p_1064) -> (-b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0)
c  in CNF:
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_2
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨  b^{14, 77}_1
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ -p_1064 ∨ -b^{14, 77}_0
c  in DIMACS:
 12491  12492 -12493 -1064 -12494 0
 12491  12492 -12493 -1064  12495 0
 12491  12492 -12493 -1064 -12496 0

c  2+1 --> break 
c    (-b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 12491 -12492  12493 -1064 1162 0


c  2-1 --> 1
c    (-b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧ -p_1064) -> (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0)
c  in CNF:
c     b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_2
c     b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_1
c     b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨  b^{14, 77}_0
c  in DIMACS:
 12491 -12492  12493  1064 -12494 0
 12491 -12492  12493  1064 -12495 0
 12491 -12492  12493  1064  12496 0

c  1-1 --> 0
c    (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0 ∧ -p_1064) -> (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧ -b^{14, 77}_0)
c  in CNF:
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_2
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_1
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_0
c  in DIMACS:
 12491  12492 -12493  1064 -12494 0
 12491  12492 -12493  1064 -12495 0
 12491  12492 -12493  1064 -12496 0

c  0-1 --> -1
c    (-b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧ -p_1064) -> ( b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0)
c  in CNF:
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨  b^{14, 77}_2
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_1
c     b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨  b^{14, 77}_0
c  in DIMACS:
 12491  12492  12493  1064  12494 0
 12491  12492  12493  1064 -12495 0
 12491  12492  12493  1064  12496 0

c  -1-1 --> -2
c    ( b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧  b^{14, 76}_0 ∧ -p_1064) -> ( b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0)
c  in CNF:
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨  b^{14, 77}_2
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨  b^{14, 77}_1
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨  p_1064 ∨ -b^{14, 77}_0
c  in DIMACS:
-12491  12492 -12493  1064  12494 0
-12491  12492 -12493  1064  12495 0
-12491  12492 -12493  1064 -12496 0

c  -2-1 --> break 
c    ( b^{14, 76}_2 ∧  b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨  b^{14, 76}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-12491 -12492  12493  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 76}_2 ∧ -b^{14, 76}_1 ∧ -b^{14, 76}_0 ∧ true) 
c  in CNF:
c    -b^{14, 76}_2 ∨  b^{14, 76}_1 ∨  b^{14, 76}_0 ∨ false 
c  in DIMACS:
-12491  12492  12493  0

c  3 does not represent an automaton state.
c    -(-b^{14, 76}_2 ∧  b^{14, 76}_1 ∧  b^{14, 76}_0 ∧ true) 
c  in CNF:
c     b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ false 
c  in DIMACS:
 12491 -12492 -12493  0
c  -3 does not represent an automaton state.
c    -( b^{14, 76}_2 ∧  b^{14, 76}_1 ∧  b^{14, 76}_0 ∧ true) 
c  in CNF:
c    -b^{14, 76}_2 ∨ -b^{14, 76}_1 ∨ -b^{14, 76}_0 ∨ false 
c  in DIMACS:
-12491 -12492 -12493  0

c i = 77
c  -2+1 --> -1
c    ( b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧  p_1078) -> ( b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0)
c  in CNF:
c    -b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨  b^{14, 78}_2
c    -b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_1
c    -b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨  b^{14, 78}_0
c  in DIMACS:
-12494 -12495  12496 -1078  12497 0
-12494 -12495  12496 -1078 -12498 0
-12494 -12495  12496 -1078  12499 0

c  -1+1 --> 0
c    ( b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0 ∧  p_1078) -> (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧ -b^{14, 78}_0)
c  in CNF:
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_2
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_1
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_0
c  in DIMACS:
-12494  12495 -12496 -1078 -12497 0
-12494  12495 -12496 -1078 -12498 0
-12494  12495 -12496 -1078 -12499 0

c  0+1 --> 1
c    (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧  p_1078) -> (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0)
c  in CNF:
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_2
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_1
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨  b^{14, 78}_0
c  in DIMACS:
 12494  12495  12496 -1078 -12497 0
 12494  12495  12496 -1078 -12498 0
 12494  12495  12496 -1078  12499 0

c  1+1 --> 2
c    (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0 ∧  p_1078) -> (-b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0)
c  in CNF:
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_2
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨  b^{14, 78}_1
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ -p_1078 ∨ -b^{14, 78}_0
c  in DIMACS:
 12494  12495 -12496 -1078 -12497 0
 12494  12495 -12496 -1078  12498 0
 12494  12495 -12496 -1078 -12499 0

c  2+1 --> break 
c    (-b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 12494 -12495  12496 -1078 1162 0


c  2-1 --> 1
c    (-b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧ -p_1078) -> (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0)
c  in CNF:
c     b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_2
c     b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_1
c     b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨  b^{14, 78}_0
c  in DIMACS:
 12494 -12495  12496  1078 -12497 0
 12494 -12495  12496  1078 -12498 0
 12494 -12495  12496  1078  12499 0

c  1-1 --> 0
c    (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0 ∧ -p_1078) -> (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧ -b^{14, 78}_0)
c  in CNF:
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_2
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_1
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_0
c  in DIMACS:
 12494  12495 -12496  1078 -12497 0
 12494  12495 -12496  1078 -12498 0
 12494  12495 -12496  1078 -12499 0

c  0-1 --> -1
c    (-b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧ -p_1078) -> ( b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0)
c  in CNF:
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨  b^{14, 78}_2
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_1
c     b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨  b^{14, 78}_0
c  in DIMACS:
 12494  12495  12496  1078  12497 0
 12494  12495  12496  1078 -12498 0
 12494  12495  12496  1078  12499 0

c  -1-1 --> -2
c    ( b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧  b^{14, 77}_0 ∧ -p_1078) -> ( b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0)
c  in CNF:
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨  b^{14, 78}_2
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨  b^{14, 78}_1
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨  p_1078 ∨ -b^{14, 78}_0
c  in DIMACS:
-12494  12495 -12496  1078  12497 0
-12494  12495 -12496  1078  12498 0
-12494  12495 -12496  1078 -12499 0

c  -2-1 --> break 
c    ( b^{14, 77}_2 ∧  b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨  b^{14, 77}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-12494 -12495  12496  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 77}_2 ∧ -b^{14, 77}_1 ∧ -b^{14, 77}_0 ∧ true) 
c  in CNF:
c    -b^{14, 77}_2 ∨  b^{14, 77}_1 ∨  b^{14, 77}_0 ∨ false 
c  in DIMACS:
-12494  12495  12496  0

c  3 does not represent an automaton state.
c    -(-b^{14, 77}_2 ∧  b^{14, 77}_1 ∧  b^{14, 77}_0 ∧ true) 
c  in CNF:
c     b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ false 
c  in DIMACS:
 12494 -12495 -12496  0
c  -3 does not represent an automaton state.
c    -( b^{14, 77}_2 ∧  b^{14, 77}_1 ∧  b^{14, 77}_0 ∧ true) 
c  in CNF:
c    -b^{14, 77}_2 ∨ -b^{14, 77}_1 ∨ -b^{14, 77}_0 ∨ false 
c  in DIMACS:
-12494 -12495 -12496  0

c i = 78
c  -2+1 --> -1
c    ( b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧  p_1092) -> ( b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0)
c  in CNF:
c    -b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨  b^{14, 79}_2
c    -b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_1
c    -b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨  b^{14, 79}_0
c  in DIMACS:
-12497 -12498  12499 -1092  12500 0
-12497 -12498  12499 -1092 -12501 0
-12497 -12498  12499 -1092  12502 0

c  -1+1 --> 0
c    ( b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0 ∧  p_1092) -> (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧ -b^{14, 79}_0)
c  in CNF:
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_2
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_1
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_0
c  in DIMACS:
-12497  12498 -12499 -1092 -12500 0
-12497  12498 -12499 -1092 -12501 0
-12497  12498 -12499 -1092 -12502 0

c  0+1 --> 1
c    (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧  p_1092) -> (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0)
c  in CNF:
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_2
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_1
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨  b^{14, 79}_0
c  in DIMACS:
 12497  12498  12499 -1092 -12500 0
 12497  12498  12499 -1092 -12501 0
 12497  12498  12499 -1092  12502 0

c  1+1 --> 2
c    (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0 ∧  p_1092) -> (-b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0)
c  in CNF:
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_2
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨  b^{14, 79}_1
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ -p_1092 ∨ -b^{14, 79}_0
c  in DIMACS:
 12497  12498 -12499 -1092 -12500 0
 12497  12498 -12499 -1092  12501 0
 12497  12498 -12499 -1092 -12502 0

c  2+1 --> break 
c    (-b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 12497 -12498  12499 -1092 1162 0


c  2-1 --> 1
c    (-b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧ -p_1092) -> (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0)
c  in CNF:
c     b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_2
c     b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_1
c     b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨  b^{14, 79}_0
c  in DIMACS:
 12497 -12498  12499  1092 -12500 0
 12497 -12498  12499  1092 -12501 0
 12497 -12498  12499  1092  12502 0

c  1-1 --> 0
c    (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0 ∧ -p_1092) -> (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧ -b^{14, 79}_0)
c  in CNF:
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_2
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_1
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_0
c  in DIMACS:
 12497  12498 -12499  1092 -12500 0
 12497  12498 -12499  1092 -12501 0
 12497  12498 -12499  1092 -12502 0

c  0-1 --> -1
c    (-b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧ -p_1092) -> ( b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0)
c  in CNF:
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨  b^{14, 79}_2
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_1
c     b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨  b^{14, 79}_0
c  in DIMACS:
 12497  12498  12499  1092  12500 0
 12497  12498  12499  1092 -12501 0
 12497  12498  12499  1092  12502 0

c  -1-1 --> -2
c    ( b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧  b^{14, 78}_0 ∧ -p_1092) -> ( b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0)
c  in CNF:
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨  b^{14, 79}_2
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨  b^{14, 79}_1
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨  p_1092 ∨ -b^{14, 79}_0
c  in DIMACS:
-12497  12498 -12499  1092  12500 0
-12497  12498 -12499  1092  12501 0
-12497  12498 -12499  1092 -12502 0

c  -2-1 --> break 
c    ( b^{14, 78}_2 ∧  b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨  b^{14, 78}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-12497 -12498  12499  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 78}_2 ∧ -b^{14, 78}_1 ∧ -b^{14, 78}_0 ∧ true) 
c  in CNF:
c    -b^{14, 78}_2 ∨  b^{14, 78}_1 ∨  b^{14, 78}_0 ∨ false 
c  in DIMACS:
-12497  12498  12499  0

c  3 does not represent an automaton state.
c    -(-b^{14, 78}_2 ∧  b^{14, 78}_1 ∧  b^{14, 78}_0 ∧ true) 
c  in CNF:
c     b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ false 
c  in DIMACS:
 12497 -12498 -12499  0
c  -3 does not represent an automaton state.
c    -( b^{14, 78}_2 ∧  b^{14, 78}_1 ∧  b^{14, 78}_0 ∧ true) 
c  in CNF:
c    -b^{14, 78}_2 ∨ -b^{14, 78}_1 ∨ -b^{14, 78}_0 ∨ false 
c  in DIMACS:
-12497 -12498 -12499  0

c i = 79
c  -2+1 --> -1
c    ( b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧  p_1106) -> ( b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0)
c  in CNF:
c    -b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨  b^{14, 80}_2
c    -b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_1
c    -b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨  b^{14, 80}_0
c  in DIMACS:
-12500 -12501  12502 -1106  12503 0
-12500 -12501  12502 -1106 -12504 0
-12500 -12501  12502 -1106  12505 0

c  -1+1 --> 0
c    ( b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0 ∧  p_1106) -> (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧ -b^{14, 80}_0)
c  in CNF:
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_2
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_1
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_0
c  in DIMACS:
-12500  12501 -12502 -1106 -12503 0
-12500  12501 -12502 -1106 -12504 0
-12500  12501 -12502 -1106 -12505 0

c  0+1 --> 1
c    (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧  p_1106) -> (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0)
c  in CNF:
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_2
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_1
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨  b^{14, 80}_0
c  in DIMACS:
 12500  12501  12502 -1106 -12503 0
 12500  12501  12502 -1106 -12504 0
 12500  12501  12502 -1106  12505 0

c  1+1 --> 2
c    (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0 ∧  p_1106) -> (-b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0)
c  in CNF:
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_2
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨  b^{14, 80}_1
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ -p_1106 ∨ -b^{14, 80}_0
c  in DIMACS:
 12500  12501 -12502 -1106 -12503 0
 12500  12501 -12502 -1106  12504 0
 12500  12501 -12502 -1106 -12505 0

c  2+1 --> break 
c    (-b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 12500 -12501  12502 -1106 1162 0


c  2-1 --> 1
c    (-b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧ -p_1106) -> (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0)
c  in CNF:
c     b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_2
c     b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_1
c     b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨  b^{14, 80}_0
c  in DIMACS:
 12500 -12501  12502  1106 -12503 0
 12500 -12501  12502  1106 -12504 0
 12500 -12501  12502  1106  12505 0

c  1-1 --> 0
c    (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0 ∧ -p_1106) -> (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧ -b^{14, 80}_0)
c  in CNF:
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_2
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_1
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_0
c  in DIMACS:
 12500  12501 -12502  1106 -12503 0
 12500  12501 -12502  1106 -12504 0
 12500  12501 -12502  1106 -12505 0

c  0-1 --> -1
c    (-b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧ -p_1106) -> ( b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0)
c  in CNF:
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨  b^{14, 80}_2
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_1
c     b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨  b^{14, 80}_0
c  in DIMACS:
 12500  12501  12502  1106  12503 0
 12500  12501  12502  1106 -12504 0
 12500  12501  12502  1106  12505 0

c  -1-1 --> -2
c    ( b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧  b^{14, 79}_0 ∧ -p_1106) -> ( b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0)
c  in CNF:
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨  b^{14, 80}_2
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨  b^{14, 80}_1
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨  p_1106 ∨ -b^{14, 80}_0
c  in DIMACS:
-12500  12501 -12502  1106  12503 0
-12500  12501 -12502  1106  12504 0
-12500  12501 -12502  1106 -12505 0

c  -2-1 --> break 
c    ( b^{14, 79}_2 ∧  b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨  b^{14, 79}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-12500 -12501  12502  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 79}_2 ∧ -b^{14, 79}_1 ∧ -b^{14, 79}_0 ∧ true) 
c  in CNF:
c    -b^{14, 79}_2 ∨  b^{14, 79}_1 ∨  b^{14, 79}_0 ∨ false 
c  in DIMACS:
-12500  12501  12502  0

c  3 does not represent an automaton state.
c    -(-b^{14, 79}_2 ∧  b^{14, 79}_1 ∧  b^{14, 79}_0 ∧ true) 
c  in CNF:
c     b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ false 
c  in DIMACS:
 12500 -12501 -12502  0
c  -3 does not represent an automaton state.
c    -( b^{14, 79}_2 ∧  b^{14, 79}_1 ∧  b^{14, 79}_0 ∧ true) 
c  in CNF:
c    -b^{14, 79}_2 ∨ -b^{14, 79}_1 ∨ -b^{14, 79}_0 ∨ false 
c  in DIMACS:
-12500 -12501 -12502  0

c i = 80
c  -2+1 --> -1
c    ( b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧  p_1120) -> ( b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0)
c  in CNF:
c    -b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨  b^{14, 81}_2
c    -b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_1
c    -b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨  b^{14, 81}_0
c  in DIMACS:
-12503 -12504  12505 -1120  12506 0
-12503 -12504  12505 -1120 -12507 0
-12503 -12504  12505 -1120  12508 0

c  -1+1 --> 0
c    ( b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0 ∧  p_1120) -> (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧ -b^{14, 81}_0)
c  in CNF:
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_2
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_1
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_0
c  in DIMACS:
-12503  12504 -12505 -1120 -12506 0
-12503  12504 -12505 -1120 -12507 0
-12503  12504 -12505 -1120 -12508 0

c  0+1 --> 1
c    (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧  p_1120) -> (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0)
c  in CNF:
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_2
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_1
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨  b^{14, 81}_0
c  in DIMACS:
 12503  12504  12505 -1120 -12506 0
 12503  12504  12505 -1120 -12507 0
 12503  12504  12505 -1120  12508 0

c  1+1 --> 2
c    (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0 ∧  p_1120) -> (-b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0)
c  in CNF:
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_2
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨  b^{14, 81}_1
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ -p_1120 ∨ -b^{14, 81}_0
c  in DIMACS:
 12503  12504 -12505 -1120 -12506 0
 12503  12504 -12505 -1120  12507 0
 12503  12504 -12505 -1120 -12508 0

c  2+1 --> break 
c    (-b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 12503 -12504  12505 -1120 1162 0


c  2-1 --> 1
c    (-b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧ -p_1120) -> (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0)
c  in CNF:
c     b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_2
c     b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_1
c     b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨  b^{14, 81}_0
c  in DIMACS:
 12503 -12504  12505  1120 -12506 0
 12503 -12504  12505  1120 -12507 0
 12503 -12504  12505  1120  12508 0

c  1-1 --> 0
c    (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0 ∧ -p_1120) -> (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧ -b^{14, 81}_0)
c  in CNF:
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_2
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_1
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_0
c  in DIMACS:
 12503  12504 -12505  1120 -12506 0
 12503  12504 -12505  1120 -12507 0
 12503  12504 -12505  1120 -12508 0

c  0-1 --> -1
c    (-b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧ -p_1120) -> ( b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0)
c  in CNF:
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨  b^{14, 81}_2
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_1
c     b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨  b^{14, 81}_0
c  in DIMACS:
 12503  12504  12505  1120  12506 0
 12503  12504  12505  1120 -12507 0
 12503  12504  12505  1120  12508 0

c  -1-1 --> -2
c    ( b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧  b^{14, 80}_0 ∧ -p_1120) -> ( b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0)
c  in CNF:
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨  b^{14, 81}_2
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨  b^{14, 81}_1
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨  p_1120 ∨ -b^{14, 81}_0
c  in DIMACS:
-12503  12504 -12505  1120  12506 0
-12503  12504 -12505  1120  12507 0
-12503  12504 -12505  1120 -12508 0

c  -2-1 --> break 
c    ( b^{14, 80}_2 ∧  b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨  b^{14, 80}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-12503 -12504  12505  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 80}_2 ∧ -b^{14, 80}_1 ∧ -b^{14, 80}_0 ∧ true) 
c  in CNF:
c    -b^{14, 80}_2 ∨  b^{14, 80}_1 ∨  b^{14, 80}_0 ∨ false 
c  in DIMACS:
-12503  12504  12505  0

c  3 does not represent an automaton state.
c    -(-b^{14, 80}_2 ∧  b^{14, 80}_1 ∧  b^{14, 80}_0 ∧ true) 
c  in CNF:
c     b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ false 
c  in DIMACS:
 12503 -12504 -12505  0
c  -3 does not represent an automaton state.
c    -( b^{14, 80}_2 ∧  b^{14, 80}_1 ∧  b^{14, 80}_0 ∧ true) 
c  in CNF:
c    -b^{14, 80}_2 ∨ -b^{14, 80}_1 ∨ -b^{14, 80}_0 ∨ false 
c  in DIMACS:
-12503 -12504 -12505  0

c i = 81
c  -2+1 --> -1
c    ( b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧  p_1134) -> ( b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0)
c  in CNF:
c    -b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨  b^{14, 82}_2
c    -b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_1
c    -b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨  b^{14, 82}_0
c  in DIMACS:
-12506 -12507  12508 -1134  12509 0
-12506 -12507  12508 -1134 -12510 0
-12506 -12507  12508 -1134  12511 0

c  -1+1 --> 0
c    ( b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0 ∧  p_1134) -> (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧ -b^{14, 82}_0)
c  in CNF:
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_2
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_1
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_0
c  in DIMACS:
-12506  12507 -12508 -1134 -12509 0
-12506  12507 -12508 -1134 -12510 0
-12506  12507 -12508 -1134 -12511 0

c  0+1 --> 1
c    (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧  p_1134) -> (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0)
c  in CNF:
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_2
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_1
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨  b^{14, 82}_0
c  in DIMACS:
 12506  12507  12508 -1134 -12509 0
 12506  12507  12508 -1134 -12510 0
 12506  12507  12508 -1134  12511 0

c  1+1 --> 2
c    (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0 ∧  p_1134) -> (-b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0)
c  in CNF:
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_2
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨  b^{14, 82}_1
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ -p_1134 ∨ -b^{14, 82}_0
c  in DIMACS:
 12506  12507 -12508 -1134 -12509 0
 12506  12507 -12508 -1134  12510 0
 12506  12507 -12508 -1134 -12511 0

c  2+1 --> break 
c    (-b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 12506 -12507  12508 -1134 1162 0


c  2-1 --> 1
c    (-b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧ -p_1134) -> (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0)
c  in CNF:
c     b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_2
c     b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_1
c     b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨  b^{14, 82}_0
c  in DIMACS:
 12506 -12507  12508  1134 -12509 0
 12506 -12507  12508  1134 -12510 0
 12506 -12507  12508  1134  12511 0

c  1-1 --> 0
c    (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0 ∧ -p_1134) -> (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧ -b^{14, 82}_0)
c  in CNF:
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_2
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_1
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_0
c  in DIMACS:
 12506  12507 -12508  1134 -12509 0
 12506  12507 -12508  1134 -12510 0
 12506  12507 -12508  1134 -12511 0

c  0-1 --> -1
c    (-b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧ -p_1134) -> ( b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0)
c  in CNF:
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨  b^{14, 82}_2
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_1
c     b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨  b^{14, 82}_0
c  in DIMACS:
 12506  12507  12508  1134  12509 0
 12506  12507  12508  1134 -12510 0
 12506  12507  12508  1134  12511 0

c  -1-1 --> -2
c    ( b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧  b^{14, 81}_0 ∧ -p_1134) -> ( b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0)
c  in CNF:
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨  b^{14, 82}_2
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨  b^{14, 82}_1
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨  p_1134 ∨ -b^{14, 82}_0
c  in DIMACS:
-12506  12507 -12508  1134  12509 0
-12506  12507 -12508  1134  12510 0
-12506  12507 -12508  1134 -12511 0

c  -2-1 --> break 
c    ( b^{14, 81}_2 ∧  b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨  b^{14, 81}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-12506 -12507  12508  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 81}_2 ∧ -b^{14, 81}_1 ∧ -b^{14, 81}_0 ∧ true) 
c  in CNF:
c    -b^{14, 81}_2 ∨  b^{14, 81}_1 ∨  b^{14, 81}_0 ∨ false 
c  in DIMACS:
-12506  12507  12508  0

c  3 does not represent an automaton state.
c    -(-b^{14, 81}_2 ∧  b^{14, 81}_1 ∧  b^{14, 81}_0 ∧ true) 
c  in CNF:
c     b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ false 
c  in DIMACS:
 12506 -12507 -12508  0
c  -3 does not represent an automaton state.
c    -( b^{14, 81}_2 ∧  b^{14, 81}_1 ∧  b^{14, 81}_0 ∧ true) 
c  in CNF:
c    -b^{14, 81}_2 ∨ -b^{14, 81}_1 ∨ -b^{14, 81}_0 ∨ false 
c  in DIMACS:
-12506 -12507 -12508  0

c i = 82
c  -2+1 --> -1
c    ( b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧  p_1148) -> ( b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧  b^{14, 83}_0)
c  in CNF:
c    -b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨  b^{14, 83}_2
c    -b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_1
c    -b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨  b^{14, 83}_0
c  in DIMACS:
-12509 -12510  12511 -1148  12512 0
-12509 -12510  12511 -1148 -12513 0
-12509 -12510  12511 -1148  12514 0

c  -1+1 --> 0
c    ( b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0 ∧  p_1148) -> (-b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧ -b^{14, 83}_0)
c  in CNF:
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_2
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_1
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_0
c  in DIMACS:
-12509  12510 -12511 -1148 -12512 0
-12509  12510 -12511 -1148 -12513 0
-12509  12510 -12511 -1148 -12514 0

c  0+1 --> 1
c    (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧  p_1148) -> (-b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧  b^{14, 83}_0)
c  in CNF:
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_2
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_1
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨  b^{14, 83}_0
c  in DIMACS:
 12509  12510  12511 -1148 -12512 0
 12509  12510  12511 -1148 -12513 0
 12509  12510  12511 -1148  12514 0

c  1+1 --> 2
c    (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0 ∧  p_1148) -> (-b^{14, 83}_2 ∧  b^{14, 83}_1 ∧ -b^{14, 83}_0)
c  in CNF:
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_2
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨  b^{14, 83}_1
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ -p_1148 ∨ -b^{14, 83}_0
c  in DIMACS:
 12509  12510 -12511 -1148 -12512 0
 12509  12510 -12511 -1148  12513 0
 12509  12510 -12511 -1148 -12514 0

c  2+1 --> break 
c    (-b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 12509 -12510  12511 -1148 1162 0


c  2-1 --> 1
c    (-b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧ -p_1148) -> (-b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧  b^{14, 83}_0)
c  in CNF:
c     b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_2
c     b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_1
c     b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨  b^{14, 83}_0
c  in DIMACS:
 12509 -12510  12511  1148 -12512 0
 12509 -12510  12511  1148 -12513 0
 12509 -12510  12511  1148  12514 0

c  1-1 --> 0
c    (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0 ∧ -p_1148) -> (-b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧ -b^{14, 83}_0)
c  in CNF:
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_2
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_1
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_0
c  in DIMACS:
 12509  12510 -12511  1148 -12512 0
 12509  12510 -12511  1148 -12513 0
 12509  12510 -12511  1148 -12514 0

c  0-1 --> -1
c    (-b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧ -p_1148) -> ( b^{14, 83}_2 ∧ -b^{14, 83}_1 ∧  b^{14, 83}_0)
c  in CNF:
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨  b^{14, 83}_2
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_1
c     b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨  b^{14, 83}_0
c  in DIMACS:
 12509  12510  12511  1148  12512 0
 12509  12510  12511  1148 -12513 0
 12509  12510  12511  1148  12514 0

c  -1-1 --> -2
c    ( b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧  b^{14, 82}_0 ∧ -p_1148) -> ( b^{14, 83}_2 ∧  b^{14, 83}_1 ∧ -b^{14, 83}_0)
c  in CNF:
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨  b^{14, 83}_2
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨  b^{14, 83}_1
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨  p_1148 ∨ -b^{14, 83}_0
c  in DIMACS:
-12509  12510 -12511  1148  12512 0
-12509  12510 -12511  1148  12513 0
-12509  12510 -12511  1148 -12514 0

c  -2-1 --> break 
c    ( b^{14, 82}_2 ∧  b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨  b^{14, 82}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-12509 -12510  12511  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{14, 82}_2 ∧ -b^{14, 82}_1 ∧ -b^{14, 82}_0 ∧ true) 
c  in CNF:
c    -b^{14, 82}_2 ∨  b^{14, 82}_1 ∨  b^{14, 82}_0 ∨ false 
c  in DIMACS:
-12509  12510  12511  0

c  3 does not represent an automaton state.
c    -(-b^{14, 82}_2 ∧  b^{14, 82}_1 ∧  b^{14, 82}_0 ∧ true) 
c  in CNF:
c     b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ false 
c  in DIMACS:
 12509 -12510 -12511  0
c  -3 does not represent an automaton state.
c    -( b^{14, 82}_2 ∧  b^{14, 82}_1 ∧  b^{14, 82}_0 ∧ true) 
c  in CNF:
c    -b^{14, 82}_2 ∨ -b^{14, 82}_1 ∨ -b^{14, 82}_0 ∨ false 
c  in DIMACS:
-12509 -12510 -12511  0

c INIT for k = 15
c    -b^{15, 1}_2
c    -b^{15, 1}_1
c    -b^{15, 1}_0
c  in DIMACS:
-12515 0
-12516 0
-12517 0

c Transitions for k = 15
c i = 1
c  -2+1 --> -1
c    ( b^{15, 1}_2 ∧  b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧  p_15) -> ( b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0)
c  in CNF:
c    -b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨  b^{15, 2}_2
c    -b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_1
c    -b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨  b^{15, 2}_0
c  in DIMACS:
-12515 -12516  12517 -15  12518 0
-12515 -12516  12517 -15 -12519 0
-12515 -12516  12517 -15  12520 0

c  -1+1 --> 0
c    ( b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧  b^{15, 1}_0 ∧  p_15) -> (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧ -b^{15, 2}_0)
c  in CNF:
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_2
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_1
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_0
c  in DIMACS:
-12515  12516 -12517 -15 -12518 0
-12515  12516 -12517 -15 -12519 0
-12515  12516 -12517 -15 -12520 0

c  0+1 --> 1
c    (-b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧  p_15) -> (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0)
c  in CNF:
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_2
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_1
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨  b^{15, 2}_0
c  in DIMACS:
 12515  12516  12517 -15 -12518 0
 12515  12516  12517 -15 -12519 0
 12515  12516  12517 -15  12520 0

c  1+1 --> 2
c    (-b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧  b^{15, 1}_0 ∧  p_15) -> (-b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0)
c  in CNF:
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_2
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨  b^{15, 2}_1
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ -p_15 ∨ -b^{15, 2}_0
c  in DIMACS:
 12515  12516 -12517 -15 -12518 0
 12515  12516 -12517 -15  12519 0
 12515  12516 -12517 -15 -12520 0

c  2+1 --> break 
c    (-b^{15, 1}_2 ∧  b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧  p_15) -> break
c  in CNF:
c     b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ -p_15 ∨ break
c  in DIMACS:
 12515 -12516  12517 -15 1162 0


c  2-1 --> 1
c    (-b^{15, 1}_2 ∧  b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧ -p_15) -> (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0)
c  in CNF:
c     b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_2
c     b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_1
c     b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨  b^{15, 2}_0
c  in DIMACS:
 12515 -12516  12517  15 -12518 0
 12515 -12516  12517  15 -12519 0
 12515 -12516  12517  15  12520 0

c  1-1 --> 0
c    (-b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧  b^{15, 1}_0 ∧ -p_15) -> (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧ -b^{15, 2}_0)
c  in CNF:
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_2
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_1
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_0
c  in DIMACS:
 12515  12516 -12517  15 -12518 0
 12515  12516 -12517  15 -12519 0
 12515  12516 -12517  15 -12520 0

c  0-1 --> -1
c    (-b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧ -p_15) -> ( b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0)
c  in CNF:
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨  b^{15, 2}_2
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_1
c     b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨  b^{15, 2}_0
c  in DIMACS:
 12515  12516  12517  15  12518 0
 12515  12516  12517  15 -12519 0
 12515  12516  12517  15  12520 0

c  -1-1 --> -2
c    ( b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧  b^{15, 1}_0 ∧ -p_15) -> ( b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0)
c  in CNF:
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨  b^{15, 2}_2
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨  b^{15, 2}_1
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨  p_15 ∨ -b^{15, 2}_0
c  in DIMACS:
-12515  12516 -12517  15  12518 0
-12515  12516 -12517  15  12519 0
-12515  12516 -12517  15 -12520 0

c  -2-1 --> break 
c    ( b^{15, 1}_2 ∧  b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧ -p_15) -> break
c  in CNF:
c    -b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨  b^{15, 1}_0 ∨  p_15 ∨ break
c  in DIMACS:
-12515 -12516  12517  15 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 1}_2 ∧ -b^{15, 1}_1 ∧ -b^{15, 1}_0 ∧ true) 
c  in CNF:
c    -b^{15, 1}_2 ∨  b^{15, 1}_1 ∨  b^{15, 1}_0 ∨ false 
c  in DIMACS:
-12515  12516  12517  0

c  3 does not represent an automaton state.
c    -(-b^{15, 1}_2 ∧  b^{15, 1}_1 ∧  b^{15, 1}_0 ∧ true) 
c  in CNF:
c     b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ false 
c  in DIMACS:
 12515 -12516 -12517  0
c  -3 does not represent an automaton state.
c    -( b^{15, 1}_2 ∧  b^{15, 1}_1 ∧  b^{15, 1}_0 ∧ true) 
c  in CNF:
c    -b^{15, 1}_2 ∨ -b^{15, 1}_1 ∨ -b^{15, 1}_0 ∨ false 
c  in DIMACS:
-12515 -12516 -12517  0

c i = 2
c  -2+1 --> -1
c    ( b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧  p_30) -> ( b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0)
c  in CNF:
c    -b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨  b^{15, 3}_2
c    -b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_1
c    -b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨  b^{15, 3}_0
c  in DIMACS:
-12518 -12519  12520 -30  12521 0
-12518 -12519  12520 -30 -12522 0
-12518 -12519  12520 -30  12523 0

c  -1+1 --> 0
c    ( b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0 ∧  p_30) -> (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧ -b^{15, 3}_0)
c  in CNF:
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_2
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_1
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_0
c  in DIMACS:
-12518  12519 -12520 -30 -12521 0
-12518  12519 -12520 -30 -12522 0
-12518  12519 -12520 -30 -12523 0

c  0+1 --> 1
c    (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧  p_30) -> (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0)
c  in CNF:
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_2
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_1
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨  b^{15, 3}_0
c  in DIMACS:
 12518  12519  12520 -30 -12521 0
 12518  12519  12520 -30 -12522 0
 12518  12519  12520 -30  12523 0

c  1+1 --> 2
c    (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0 ∧  p_30) -> (-b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0)
c  in CNF:
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_2
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨  b^{15, 3}_1
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ -p_30 ∨ -b^{15, 3}_0
c  in DIMACS:
 12518  12519 -12520 -30 -12521 0
 12518  12519 -12520 -30  12522 0
 12518  12519 -12520 -30 -12523 0

c  2+1 --> break 
c    (-b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧  p_30) -> break
c  in CNF:
c     b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 12518 -12519  12520 -30 1162 0


c  2-1 --> 1
c    (-b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧ -p_30) -> (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0)
c  in CNF:
c     b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_2
c     b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_1
c     b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨  b^{15, 3}_0
c  in DIMACS:
 12518 -12519  12520  30 -12521 0
 12518 -12519  12520  30 -12522 0
 12518 -12519  12520  30  12523 0

c  1-1 --> 0
c    (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0 ∧ -p_30) -> (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧ -b^{15, 3}_0)
c  in CNF:
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_2
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_1
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_0
c  in DIMACS:
 12518  12519 -12520  30 -12521 0
 12518  12519 -12520  30 -12522 0
 12518  12519 -12520  30 -12523 0

c  0-1 --> -1
c    (-b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧ -p_30) -> ( b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0)
c  in CNF:
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨  b^{15, 3}_2
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_1
c     b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨  b^{15, 3}_0
c  in DIMACS:
 12518  12519  12520  30  12521 0
 12518  12519  12520  30 -12522 0
 12518  12519  12520  30  12523 0

c  -1-1 --> -2
c    ( b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧  b^{15, 2}_0 ∧ -p_30) -> ( b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0)
c  in CNF:
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨  b^{15, 3}_2
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨  b^{15, 3}_1
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨  p_30 ∨ -b^{15, 3}_0
c  in DIMACS:
-12518  12519 -12520  30  12521 0
-12518  12519 -12520  30  12522 0
-12518  12519 -12520  30 -12523 0

c  -2-1 --> break 
c    ( b^{15, 2}_2 ∧  b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨  b^{15, 2}_0 ∨  p_30 ∨ break
c  in DIMACS:
-12518 -12519  12520  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 2}_2 ∧ -b^{15, 2}_1 ∧ -b^{15, 2}_0 ∧ true) 
c  in CNF:
c    -b^{15, 2}_2 ∨  b^{15, 2}_1 ∨  b^{15, 2}_0 ∨ false 
c  in DIMACS:
-12518  12519  12520  0

c  3 does not represent an automaton state.
c    -(-b^{15, 2}_2 ∧  b^{15, 2}_1 ∧  b^{15, 2}_0 ∧ true) 
c  in CNF:
c     b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ false 
c  in DIMACS:
 12518 -12519 -12520  0
c  -3 does not represent an automaton state.
c    -( b^{15, 2}_2 ∧  b^{15, 2}_1 ∧  b^{15, 2}_0 ∧ true) 
c  in CNF:
c    -b^{15, 2}_2 ∨ -b^{15, 2}_1 ∨ -b^{15, 2}_0 ∨ false 
c  in DIMACS:
-12518 -12519 -12520  0

c i = 3
c  -2+1 --> -1
c    ( b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧  p_45) -> ( b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0)
c  in CNF:
c    -b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨  b^{15, 4}_2
c    -b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_1
c    -b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨  b^{15, 4}_0
c  in DIMACS:
-12521 -12522  12523 -45  12524 0
-12521 -12522  12523 -45 -12525 0
-12521 -12522  12523 -45  12526 0

c  -1+1 --> 0
c    ( b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0 ∧  p_45) -> (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧ -b^{15, 4}_0)
c  in CNF:
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_2
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_1
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_0
c  in DIMACS:
-12521  12522 -12523 -45 -12524 0
-12521  12522 -12523 -45 -12525 0
-12521  12522 -12523 -45 -12526 0

c  0+1 --> 1
c    (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧  p_45) -> (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0)
c  in CNF:
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_2
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_1
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨  b^{15, 4}_0
c  in DIMACS:
 12521  12522  12523 -45 -12524 0
 12521  12522  12523 -45 -12525 0
 12521  12522  12523 -45  12526 0

c  1+1 --> 2
c    (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0 ∧  p_45) -> (-b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0)
c  in CNF:
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_2
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨  b^{15, 4}_1
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ -p_45 ∨ -b^{15, 4}_0
c  in DIMACS:
 12521  12522 -12523 -45 -12524 0
 12521  12522 -12523 -45  12525 0
 12521  12522 -12523 -45 -12526 0

c  2+1 --> break 
c    (-b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧  p_45) -> break
c  in CNF:
c     b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 12521 -12522  12523 -45 1162 0


c  2-1 --> 1
c    (-b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧ -p_45) -> (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0)
c  in CNF:
c     b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_2
c     b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_1
c     b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨  b^{15, 4}_0
c  in DIMACS:
 12521 -12522  12523  45 -12524 0
 12521 -12522  12523  45 -12525 0
 12521 -12522  12523  45  12526 0

c  1-1 --> 0
c    (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0 ∧ -p_45) -> (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧ -b^{15, 4}_0)
c  in CNF:
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_2
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_1
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_0
c  in DIMACS:
 12521  12522 -12523  45 -12524 0
 12521  12522 -12523  45 -12525 0
 12521  12522 -12523  45 -12526 0

c  0-1 --> -1
c    (-b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧ -p_45) -> ( b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0)
c  in CNF:
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨  b^{15, 4}_2
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_1
c     b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨  b^{15, 4}_0
c  in DIMACS:
 12521  12522  12523  45  12524 0
 12521  12522  12523  45 -12525 0
 12521  12522  12523  45  12526 0

c  -1-1 --> -2
c    ( b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧  b^{15, 3}_0 ∧ -p_45) -> ( b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0)
c  in CNF:
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨  b^{15, 4}_2
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨  b^{15, 4}_1
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨  p_45 ∨ -b^{15, 4}_0
c  in DIMACS:
-12521  12522 -12523  45  12524 0
-12521  12522 -12523  45  12525 0
-12521  12522 -12523  45 -12526 0

c  -2-1 --> break 
c    ( b^{15, 3}_2 ∧  b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨  b^{15, 3}_0 ∨  p_45 ∨ break
c  in DIMACS:
-12521 -12522  12523  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 3}_2 ∧ -b^{15, 3}_1 ∧ -b^{15, 3}_0 ∧ true) 
c  in CNF:
c    -b^{15, 3}_2 ∨  b^{15, 3}_1 ∨  b^{15, 3}_0 ∨ false 
c  in DIMACS:
-12521  12522  12523  0

c  3 does not represent an automaton state.
c    -(-b^{15, 3}_2 ∧  b^{15, 3}_1 ∧  b^{15, 3}_0 ∧ true) 
c  in CNF:
c     b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ false 
c  in DIMACS:
 12521 -12522 -12523  0
c  -3 does not represent an automaton state.
c    -( b^{15, 3}_2 ∧  b^{15, 3}_1 ∧  b^{15, 3}_0 ∧ true) 
c  in CNF:
c    -b^{15, 3}_2 ∨ -b^{15, 3}_1 ∨ -b^{15, 3}_0 ∨ false 
c  in DIMACS:
-12521 -12522 -12523  0

c i = 4
c  -2+1 --> -1
c    ( b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧  p_60) -> ( b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0)
c  in CNF:
c    -b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨  b^{15, 5}_2
c    -b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_1
c    -b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨  b^{15, 5}_0
c  in DIMACS:
-12524 -12525  12526 -60  12527 0
-12524 -12525  12526 -60 -12528 0
-12524 -12525  12526 -60  12529 0

c  -1+1 --> 0
c    ( b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0 ∧  p_60) -> (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧ -b^{15, 5}_0)
c  in CNF:
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_2
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_1
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_0
c  in DIMACS:
-12524  12525 -12526 -60 -12527 0
-12524  12525 -12526 -60 -12528 0
-12524  12525 -12526 -60 -12529 0

c  0+1 --> 1
c    (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧  p_60) -> (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0)
c  in CNF:
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_2
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_1
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨  b^{15, 5}_0
c  in DIMACS:
 12524  12525  12526 -60 -12527 0
 12524  12525  12526 -60 -12528 0
 12524  12525  12526 -60  12529 0

c  1+1 --> 2
c    (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0 ∧  p_60) -> (-b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0)
c  in CNF:
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_2
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨  b^{15, 5}_1
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ -p_60 ∨ -b^{15, 5}_0
c  in DIMACS:
 12524  12525 -12526 -60 -12527 0
 12524  12525 -12526 -60  12528 0
 12524  12525 -12526 -60 -12529 0

c  2+1 --> break 
c    (-b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧  p_60) -> break
c  in CNF:
c     b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 12524 -12525  12526 -60 1162 0


c  2-1 --> 1
c    (-b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧ -p_60) -> (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0)
c  in CNF:
c     b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_2
c     b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_1
c     b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨  b^{15, 5}_0
c  in DIMACS:
 12524 -12525  12526  60 -12527 0
 12524 -12525  12526  60 -12528 0
 12524 -12525  12526  60  12529 0

c  1-1 --> 0
c    (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0 ∧ -p_60) -> (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧ -b^{15, 5}_0)
c  in CNF:
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_2
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_1
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_0
c  in DIMACS:
 12524  12525 -12526  60 -12527 0
 12524  12525 -12526  60 -12528 0
 12524  12525 -12526  60 -12529 0

c  0-1 --> -1
c    (-b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧ -p_60) -> ( b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0)
c  in CNF:
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨  b^{15, 5}_2
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_1
c     b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨  b^{15, 5}_0
c  in DIMACS:
 12524  12525  12526  60  12527 0
 12524  12525  12526  60 -12528 0
 12524  12525  12526  60  12529 0

c  -1-1 --> -2
c    ( b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧  b^{15, 4}_0 ∧ -p_60) -> ( b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0)
c  in CNF:
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨  b^{15, 5}_2
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨  b^{15, 5}_1
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨  p_60 ∨ -b^{15, 5}_0
c  in DIMACS:
-12524  12525 -12526  60  12527 0
-12524  12525 -12526  60  12528 0
-12524  12525 -12526  60 -12529 0

c  -2-1 --> break 
c    ( b^{15, 4}_2 ∧  b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨  b^{15, 4}_0 ∨  p_60 ∨ break
c  in DIMACS:
-12524 -12525  12526  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 4}_2 ∧ -b^{15, 4}_1 ∧ -b^{15, 4}_0 ∧ true) 
c  in CNF:
c    -b^{15, 4}_2 ∨  b^{15, 4}_1 ∨  b^{15, 4}_0 ∨ false 
c  in DIMACS:
-12524  12525  12526  0

c  3 does not represent an automaton state.
c    -(-b^{15, 4}_2 ∧  b^{15, 4}_1 ∧  b^{15, 4}_0 ∧ true) 
c  in CNF:
c     b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ false 
c  in DIMACS:
 12524 -12525 -12526  0
c  -3 does not represent an automaton state.
c    -( b^{15, 4}_2 ∧  b^{15, 4}_1 ∧  b^{15, 4}_0 ∧ true) 
c  in CNF:
c    -b^{15, 4}_2 ∨ -b^{15, 4}_1 ∨ -b^{15, 4}_0 ∨ false 
c  in DIMACS:
-12524 -12525 -12526  0

c i = 5
c  -2+1 --> -1
c    ( b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧  p_75) -> ( b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0)
c  in CNF:
c    -b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨  b^{15, 6}_2
c    -b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_1
c    -b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨  b^{15, 6}_0
c  in DIMACS:
-12527 -12528  12529 -75  12530 0
-12527 -12528  12529 -75 -12531 0
-12527 -12528  12529 -75  12532 0

c  -1+1 --> 0
c    ( b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0 ∧  p_75) -> (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧ -b^{15, 6}_0)
c  in CNF:
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_2
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_1
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_0
c  in DIMACS:
-12527  12528 -12529 -75 -12530 0
-12527  12528 -12529 -75 -12531 0
-12527  12528 -12529 -75 -12532 0

c  0+1 --> 1
c    (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧  p_75) -> (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0)
c  in CNF:
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_2
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_1
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨  b^{15, 6}_0
c  in DIMACS:
 12527  12528  12529 -75 -12530 0
 12527  12528  12529 -75 -12531 0
 12527  12528  12529 -75  12532 0

c  1+1 --> 2
c    (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0 ∧  p_75) -> (-b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0)
c  in CNF:
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_2
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨  b^{15, 6}_1
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ -p_75 ∨ -b^{15, 6}_0
c  in DIMACS:
 12527  12528 -12529 -75 -12530 0
 12527  12528 -12529 -75  12531 0
 12527  12528 -12529 -75 -12532 0

c  2+1 --> break 
c    (-b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧  p_75) -> break
c  in CNF:
c     b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 12527 -12528  12529 -75 1162 0


c  2-1 --> 1
c    (-b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧ -p_75) -> (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0)
c  in CNF:
c     b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_2
c     b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_1
c     b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨  b^{15, 6}_0
c  in DIMACS:
 12527 -12528  12529  75 -12530 0
 12527 -12528  12529  75 -12531 0
 12527 -12528  12529  75  12532 0

c  1-1 --> 0
c    (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0 ∧ -p_75) -> (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧ -b^{15, 6}_0)
c  in CNF:
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_2
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_1
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_0
c  in DIMACS:
 12527  12528 -12529  75 -12530 0
 12527  12528 -12529  75 -12531 0
 12527  12528 -12529  75 -12532 0

c  0-1 --> -1
c    (-b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧ -p_75) -> ( b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0)
c  in CNF:
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨  b^{15, 6}_2
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_1
c     b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨  b^{15, 6}_0
c  in DIMACS:
 12527  12528  12529  75  12530 0
 12527  12528  12529  75 -12531 0
 12527  12528  12529  75  12532 0

c  -1-1 --> -2
c    ( b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧  b^{15, 5}_0 ∧ -p_75) -> ( b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0)
c  in CNF:
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨  b^{15, 6}_2
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨  b^{15, 6}_1
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨  p_75 ∨ -b^{15, 6}_0
c  in DIMACS:
-12527  12528 -12529  75  12530 0
-12527  12528 -12529  75  12531 0
-12527  12528 -12529  75 -12532 0

c  -2-1 --> break 
c    ( b^{15, 5}_2 ∧  b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨  b^{15, 5}_0 ∨  p_75 ∨ break
c  in DIMACS:
-12527 -12528  12529  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 5}_2 ∧ -b^{15, 5}_1 ∧ -b^{15, 5}_0 ∧ true) 
c  in CNF:
c    -b^{15, 5}_2 ∨  b^{15, 5}_1 ∨  b^{15, 5}_0 ∨ false 
c  in DIMACS:
-12527  12528  12529  0

c  3 does not represent an automaton state.
c    -(-b^{15, 5}_2 ∧  b^{15, 5}_1 ∧  b^{15, 5}_0 ∧ true) 
c  in CNF:
c     b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ false 
c  in DIMACS:
 12527 -12528 -12529  0
c  -3 does not represent an automaton state.
c    -( b^{15, 5}_2 ∧  b^{15, 5}_1 ∧  b^{15, 5}_0 ∧ true) 
c  in CNF:
c    -b^{15, 5}_2 ∨ -b^{15, 5}_1 ∨ -b^{15, 5}_0 ∨ false 
c  in DIMACS:
-12527 -12528 -12529  0

c i = 6
c  -2+1 --> -1
c    ( b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧  p_90) -> ( b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0)
c  in CNF:
c    -b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨  b^{15, 7}_2
c    -b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_1
c    -b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨  b^{15, 7}_0
c  in DIMACS:
-12530 -12531  12532 -90  12533 0
-12530 -12531  12532 -90 -12534 0
-12530 -12531  12532 -90  12535 0

c  -1+1 --> 0
c    ( b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0 ∧  p_90) -> (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧ -b^{15, 7}_0)
c  in CNF:
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_2
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_1
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_0
c  in DIMACS:
-12530  12531 -12532 -90 -12533 0
-12530  12531 -12532 -90 -12534 0
-12530  12531 -12532 -90 -12535 0

c  0+1 --> 1
c    (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧  p_90) -> (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0)
c  in CNF:
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_2
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_1
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨  b^{15, 7}_0
c  in DIMACS:
 12530  12531  12532 -90 -12533 0
 12530  12531  12532 -90 -12534 0
 12530  12531  12532 -90  12535 0

c  1+1 --> 2
c    (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0 ∧  p_90) -> (-b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0)
c  in CNF:
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_2
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨  b^{15, 7}_1
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ -p_90 ∨ -b^{15, 7}_0
c  in DIMACS:
 12530  12531 -12532 -90 -12533 0
 12530  12531 -12532 -90  12534 0
 12530  12531 -12532 -90 -12535 0

c  2+1 --> break 
c    (-b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧  p_90) -> break
c  in CNF:
c     b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 12530 -12531  12532 -90 1162 0


c  2-1 --> 1
c    (-b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧ -p_90) -> (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0)
c  in CNF:
c     b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_2
c     b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_1
c     b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨  b^{15, 7}_0
c  in DIMACS:
 12530 -12531  12532  90 -12533 0
 12530 -12531  12532  90 -12534 0
 12530 -12531  12532  90  12535 0

c  1-1 --> 0
c    (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0 ∧ -p_90) -> (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧ -b^{15, 7}_0)
c  in CNF:
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_2
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_1
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_0
c  in DIMACS:
 12530  12531 -12532  90 -12533 0
 12530  12531 -12532  90 -12534 0
 12530  12531 -12532  90 -12535 0

c  0-1 --> -1
c    (-b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧ -p_90) -> ( b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0)
c  in CNF:
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨  b^{15, 7}_2
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_1
c     b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨  b^{15, 7}_0
c  in DIMACS:
 12530  12531  12532  90  12533 0
 12530  12531  12532  90 -12534 0
 12530  12531  12532  90  12535 0

c  -1-1 --> -2
c    ( b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧  b^{15, 6}_0 ∧ -p_90) -> ( b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0)
c  in CNF:
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨  b^{15, 7}_2
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨  b^{15, 7}_1
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨  p_90 ∨ -b^{15, 7}_0
c  in DIMACS:
-12530  12531 -12532  90  12533 0
-12530  12531 -12532  90  12534 0
-12530  12531 -12532  90 -12535 0

c  -2-1 --> break 
c    ( b^{15, 6}_2 ∧  b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨  b^{15, 6}_0 ∨  p_90 ∨ break
c  in DIMACS:
-12530 -12531  12532  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 6}_2 ∧ -b^{15, 6}_1 ∧ -b^{15, 6}_0 ∧ true) 
c  in CNF:
c    -b^{15, 6}_2 ∨  b^{15, 6}_1 ∨  b^{15, 6}_0 ∨ false 
c  in DIMACS:
-12530  12531  12532  0

c  3 does not represent an automaton state.
c    -(-b^{15, 6}_2 ∧  b^{15, 6}_1 ∧  b^{15, 6}_0 ∧ true) 
c  in CNF:
c     b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ false 
c  in DIMACS:
 12530 -12531 -12532  0
c  -3 does not represent an automaton state.
c    -( b^{15, 6}_2 ∧  b^{15, 6}_1 ∧  b^{15, 6}_0 ∧ true) 
c  in CNF:
c    -b^{15, 6}_2 ∨ -b^{15, 6}_1 ∨ -b^{15, 6}_0 ∨ false 
c  in DIMACS:
-12530 -12531 -12532  0

c i = 7
c  -2+1 --> -1
c    ( b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧  p_105) -> ( b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0)
c  in CNF:
c    -b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨  b^{15, 8}_2
c    -b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_1
c    -b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨  b^{15, 8}_0
c  in DIMACS:
-12533 -12534  12535 -105  12536 0
-12533 -12534  12535 -105 -12537 0
-12533 -12534  12535 -105  12538 0

c  -1+1 --> 0
c    ( b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0 ∧  p_105) -> (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧ -b^{15, 8}_0)
c  in CNF:
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_2
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_1
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_0
c  in DIMACS:
-12533  12534 -12535 -105 -12536 0
-12533  12534 -12535 -105 -12537 0
-12533  12534 -12535 -105 -12538 0

c  0+1 --> 1
c    (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧  p_105) -> (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0)
c  in CNF:
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_2
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_1
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨  b^{15, 8}_0
c  in DIMACS:
 12533  12534  12535 -105 -12536 0
 12533  12534  12535 -105 -12537 0
 12533  12534  12535 -105  12538 0

c  1+1 --> 2
c    (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0 ∧  p_105) -> (-b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0)
c  in CNF:
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_2
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨  b^{15, 8}_1
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ -p_105 ∨ -b^{15, 8}_0
c  in DIMACS:
 12533  12534 -12535 -105 -12536 0
 12533  12534 -12535 -105  12537 0
 12533  12534 -12535 -105 -12538 0

c  2+1 --> break 
c    (-b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧  p_105) -> break
c  in CNF:
c     b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 12533 -12534  12535 -105 1162 0


c  2-1 --> 1
c    (-b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧ -p_105) -> (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0)
c  in CNF:
c     b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_2
c     b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_1
c     b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨  b^{15, 8}_0
c  in DIMACS:
 12533 -12534  12535  105 -12536 0
 12533 -12534  12535  105 -12537 0
 12533 -12534  12535  105  12538 0

c  1-1 --> 0
c    (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0 ∧ -p_105) -> (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧ -b^{15, 8}_0)
c  in CNF:
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_2
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_1
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_0
c  in DIMACS:
 12533  12534 -12535  105 -12536 0
 12533  12534 -12535  105 -12537 0
 12533  12534 -12535  105 -12538 0

c  0-1 --> -1
c    (-b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧ -p_105) -> ( b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0)
c  in CNF:
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨  b^{15, 8}_2
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_1
c     b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨  b^{15, 8}_0
c  in DIMACS:
 12533  12534  12535  105  12536 0
 12533  12534  12535  105 -12537 0
 12533  12534  12535  105  12538 0

c  -1-1 --> -2
c    ( b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧  b^{15, 7}_0 ∧ -p_105) -> ( b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0)
c  in CNF:
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨  b^{15, 8}_2
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨  b^{15, 8}_1
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨  p_105 ∨ -b^{15, 8}_0
c  in DIMACS:
-12533  12534 -12535  105  12536 0
-12533  12534 -12535  105  12537 0
-12533  12534 -12535  105 -12538 0

c  -2-1 --> break 
c    ( b^{15, 7}_2 ∧  b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨  b^{15, 7}_0 ∨  p_105 ∨ break
c  in DIMACS:
-12533 -12534  12535  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 7}_2 ∧ -b^{15, 7}_1 ∧ -b^{15, 7}_0 ∧ true) 
c  in CNF:
c    -b^{15, 7}_2 ∨  b^{15, 7}_1 ∨  b^{15, 7}_0 ∨ false 
c  in DIMACS:
-12533  12534  12535  0

c  3 does not represent an automaton state.
c    -(-b^{15, 7}_2 ∧  b^{15, 7}_1 ∧  b^{15, 7}_0 ∧ true) 
c  in CNF:
c     b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ false 
c  in DIMACS:
 12533 -12534 -12535  0
c  -3 does not represent an automaton state.
c    -( b^{15, 7}_2 ∧  b^{15, 7}_1 ∧  b^{15, 7}_0 ∧ true) 
c  in CNF:
c    -b^{15, 7}_2 ∨ -b^{15, 7}_1 ∨ -b^{15, 7}_0 ∨ false 
c  in DIMACS:
-12533 -12534 -12535  0

c i = 8
c  -2+1 --> -1
c    ( b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧  p_120) -> ( b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0)
c  in CNF:
c    -b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨  b^{15, 9}_2
c    -b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_1
c    -b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨  b^{15, 9}_0
c  in DIMACS:
-12536 -12537  12538 -120  12539 0
-12536 -12537  12538 -120 -12540 0
-12536 -12537  12538 -120  12541 0

c  -1+1 --> 0
c    ( b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0 ∧  p_120) -> (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧ -b^{15, 9}_0)
c  in CNF:
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_2
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_1
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_0
c  in DIMACS:
-12536  12537 -12538 -120 -12539 0
-12536  12537 -12538 -120 -12540 0
-12536  12537 -12538 -120 -12541 0

c  0+1 --> 1
c    (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧  p_120) -> (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0)
c  in CNF:
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_2
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_1
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨  b^{15, 9}_0
c  in DIMACS:
 12536  12537  12538 -120 -12539 0
 12536  12537  12538 -120 -12540 0
 12536  12537  12538 -120  12541 0

c  1+1 --> 2
c    (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0 ∧  p_120) -> (-b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0)
c  in CNF:
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_2
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨  b^{15, 9}_1
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ -p_120 ∨ -b^{15, 9}_0
c  in DIMACS:
 12536  12537 -12538 -120 -12539 0
 12536  12537 -12538 -120  12540 0
 12536  12537 -12538 -120 -12541 0

c  2+1 --> break 
c    (-b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧  p_120) -> break
c  in CNF:
c     b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 12536 -12537  12538 -120 1162 0


c  2-1 --> 1
c    (-b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧ -p_120) -> (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0)
c  in CNF:
c     b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_2
c     b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_1
c     b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨  b^{15, 9}_0
c  in DIMACS:
 12536 -12537  12538  120 -12539 0
 12536 -12537  12538  120 -12540 0
 12536 -12537  12538  120  12541 0

c  1-1 --> 0
c    (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0 ∧ -p_120) -> (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧ -b^{15, 9}_0)
c  in CNF:
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_2
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_1
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_0
c  in DIMACS:
 12536  12537 -12538  120 -12539 0
 12536  12537 -12538  120 -12540 0
 12536  12537 -12538  120 -12541 0

c  0-1 --> -1
c    (-b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧ -p_120) -> ( b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0)
c  in CNF:
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨  b^{15, 9}_2
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_1
c     b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨  b^{15, 9}_0
c  in DIMACS:
 12536  12537  12538  120  12539 0
 12536  12537  12538  120 -12540 0
 12536  12537  12538  120  12541 0

c  -1-1 --> -2
c    ( b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧  b^{15, 8}_0 ∧ -p_120) -> ( b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0)
c  in CNF:
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨  b^{15, 9}_2
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨  b^{15, 9}_1
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨  p_120 ∨ -b^{15, 9}_0
c  in DIMACS:
-12536  12537 -12538  120  12539 0
-12536  12537 -12538  120  12540 0
-12536  12537 -12538  120 -12541 0

c  -2-1 --> break 
c    ( b^{15, 8}_2 ∧  b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨  b^{15, 8}_0 ∨  p_120 ∨ break
c  in DIMACS:
-12536 -12537  12538  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 8}_2 ∧ -b^{15, 8}_1 ∧ -b^{15, 8}_0 ∧ true) 
c  in CNF:
c    -b^{15, 8}_2 ∨  b^{15, 8}_1 ∨  b^{15, 8}_0 ∨ false 
c  in DIMACS:
-12536  12537  12538  0

c  3 does not represent an automaton state.
c    -(-b^{15, 8}_2 ∧  b^{15, 8}_1 ∧  b^{15, 8}_0 ∧ true) 
c  in CNF:
c     b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ false 
c  in DIMACS:
 12536 -12537 -12538  0
c  -3 does not represent an automaton state.
c    -( b^{15, 8}_2 ∧  b^{15, 8}_1 ∧  b^{15, 8}_0 ∧ true) 
c  in CNF:
c    -b^{15, 8}_2 ∨ -b^{15, 8}_1 ∨ -b^{15, 8}_0 ∨ false 
c  in DIMACS:
-12536 -12537 -12538  0

c i = 9
c  -2+1 --> -1
c    ( b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧  p_135) -> ( b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0)
c  in CNF:
c    -b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨  b^{15, 10}_2
c    -b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_1
c    -b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨  b^{15, 10}_0
c  in DIMACS:
-12539 -12540  12541 -135  12542 0
-12539 -12540  12541 -135 -12543 0
-12539 -12540  12541 -135  12544 0

c  -1+1 --> 0
c    ( b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0 ∧  p_135) -> (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧ -b^{15, 10}_0)
c  in CNF:
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_2
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_1
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_0
c  in DIMACS:
-12539  12540 -12541 -135 -12542 0
-12539  12540 -12541 -135 -12543 0
-12539  12540 -12541 -135 -12544 0

c  0+1 --> 1
c    (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧  p_135) -> (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0)
c  in CNF:
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_2
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_1
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨  b^{15, 10}_0
c  in DIMACS:
 12539  12540  12541 -135 -12542 0
 12539  12540  12541 -135 -12543 0
 12539  12540  12541 -135  12544 0

c  1+1 --> 2
c    (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0 ∧  p_135) -> (-b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0)
c  in CNF:
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_2
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨  b^{15, 10}_1
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ -p_135 ∨ -b^{15, 10}_0
c  in DIMACS:
 12539  12540 -12541 -135 -12542 0
 12539  12540 -12541 -135  12543 0
 12539  12540 -12541 -135 -12544 0

c  2+1 --> break 
c    (-b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧  p_135) -> break
c  in CNF:
c     b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 12539 -12540  12541 -135 1162 0


c  2-1 --> 1
c    (-b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧ -p_135) -> (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0)
c  in CNF:
c     b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_2
c     b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_1
c     b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨  b^{15, 10}_0
c  in DIMACS:
 12539 -12540  12541  135 -12542 0
 12539 -12540  12541  135 -12543 0
 12539 -12540  12541  135  12544 0

c  1-1 --> 0
c    (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0 ∧ -p_135) -> (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧ -b^{15, 10}_0)
c  in CNF:
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_2
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_1
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_0
c  in DIMACS:
 12539  12540 -12541  135 -12542 0
 12539  12540 -12541  135 -12543 0
 12539  12540 -12541  135 -12544 0

c  0-1 --> -1
c    (-b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧ -p_135) -> ( b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0)
c  in CNF:
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨  b^{15, 10}_2
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_1
c     b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨  b^{15, 10}_0
c  in DIMACS:
 12539  12540  12541  135  12542 0
 12539  12540  12541  135 -12543 0
 12539  12540  12541  135  12544 0

c  -1-1 --> -2
c    ( b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧  b^{15, 9}_0 ∧ -p_135) -> ( b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0)
c  in CNF:
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨  b^{15, 10}_2
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨  b^{15, 10}_1
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨  p_135 ∨ -b^{15, 10}_0
c  in DIMACS:
-12539  12540 -12541  135  12542 0
-12539  12540 -12541  135  12543 0
-12539  12540 -12541  135 -12544 0

c  -2-1 --> break 
c    ( b^{15, 9}_2 ∧  b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨  b^{15, 9}_0 ∨  p_135 ∨ break
c  in DIMACS:
-12539 -12540  12541  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 9}_2 ∧ -b^{15, 9}_1 ∧ -b^{15, 9}_0 ∧ true) 
c  in CNF:
c    -b^{15, 9}_2 ∨  b^{15, 9}_1 ∨  b^{15, 9}_0 ∨ false 
c  in DIMACS:
-12539  12540  12541  0

c  3 does not represent an automaton state.
c    -(-b^{15, 9}_2 ∧  b^{15, 9}_1 ∧  b^{15, 9}_0 ∧ true) 
c  in CNF:
c     b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ false 
c  in DIMACS:
 12539 -12540 -12541  0
c  -3 does not represent an automaton state.
c    -( b^{15, 9}_2 ∧  b^{15, 9}_1 ∧  b^{15, 9}_0 ∧ true) 
c  in CNF:
c    -b^{15, 9}_2 ∨ -b^{15, 9}_1 ∨ -b^{15, 9}_0 ∨ false 
c  in DIMACS:
-12539 -12540 -12541  0

c i = 10
c  -2+1 --> -1
c    ( b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧  p_150) -> ( b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0)
c  in CNF:
c    -b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨  b^{15, 11}_2
c    -b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_1
c    -b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨  b^{15, 11}_0
c  in DIMACS:
-12542 -12543  12544 -150  12545 0
-12542 -12543  12544 -150 -12546 0
-12542 -12543  12544 -150  12547 0

c  -1+1 --> 0
c    ( b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0 ∧  p_150) -> (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧ -b^{15, 11}_0)
c  in CNF:
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_2
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_1
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_0
c  in DIMACS:
-12542  12543 -12544 -150 -12545 0
-12542  12543 -12544 -150 -12546 0
-12542  12543 -12544 -150 -12547 0

c  0+1 --> 1
c    (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧  p_150) -> (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0)
c  in CNF:
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_2
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_1
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨  b^{15, 11}_0
c  in DIMACS:
 12542  12543  12544 -150 -12545 0
 12542  12543  12544 -150 -12546 0
 12542  12543  12544 -150  12547 0

c  1+1 --> 2
c    (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0 ∧  p_150) -> (-b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0)
c  in CNF:
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_2
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨  b^{15, 11}_1
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ -p_150 ∨ -b^{15, 11}_0
c  in DIMACS:
 12542  12543 -12544 -150 -12545 0
 12542  12543 -12544 -150  12546 0
 12542  12543 -12544 -150 -12547 0

c  2+1 --> break 
c    (-b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧  p_150) -> break
c  in CNF:
c     b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 12542 -12543  12544 -150 1162 0


c  2-1 --> 1
c    (-b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧ -p_150) -> (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0)
c  in CNF:
c     b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_2
c     b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_1
c     b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨  b^{15, 11}_0
c  in DIMACS:
 12542 -12543  12544  150 -12545 0
 12542 -12543  12544  150 -12546 0
 12542 -12543  12544  150  12547 0

c  1-1 --> 0
c    (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0 ∧ -p_150) -> (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧ -b^{15, 11}_0)
c  in CNF:
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_2
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_1
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_0
c  in DIMACS:
 12542  12543 -12544  150 -12545 0
 12542  12543 -12544  150 -12546 0
 12542  12543 -12544  150 -12547 0

c  0-1 --> -1
c    (-b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧ -p_150) -> ( b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0)
c  in CNF:
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨  b^{15, 11}_2
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_1
c     b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨  b^{15, 11}_0
c  in DIMACS:
 12542  12543  12544  150  12545 0
 12542  12543  12544  150 -12546 0
 12542  12543  12544  150  12547 0

c  -1-1 --> -2
c    ( b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧  b^{15, 10}_0 ∧ -p_150) -> ( b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0)
c  in CNF:
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨  b^{15, 11}_2
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨  b^{15, 11}_1
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨  p_150 ∨ -b^{15, 11}_0
c  in DIMACS:
-12542  12543 -12544  150  12545 0
-12542  12543 -12544  150  12546 0
-12542  12543 -12544  150 -12547 0

c  -2-1 --> break 
c    ( b^{15, 10}_2 ∧  b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨  b^{15, 10}_0 ∨  p_150 ∨ break
c  in DIMACS:
-12542 -12543  12544  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 10}_2 ∧ -b^{15, 10}_1 ∧ -b^{15, 10}_0 ∧ true) 
c  in CNF:
c    -b^{15, 10}_2 ∨  b^{15, 10}_1 ∨  b^{15, 10}_0 ∨ false 
c  in DIMACS:
-12542  12543  12544  0

c  3 does not represent an automaton state.
c    -(-b^{15, 10}_2 ∧  b^{15, 10}_1 ∧  b^{15, 10}_0 ∧ true) 
c  in CNF:
c     b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ false 
c  in DIMACS:
 12542 -12543 -12544  0
c  -3 does not represent an automaton state.
c    -( b^{15, 10}_2 ∧  b^{15, 10}_1 ∧  b^{15, 10}_0 ∧ true) 
c  in CNF:
c    -b^{15, 10}_2 ∨ -b^{15, 10}_1 ∨ -b^{15, 10}_0 ∨ false 
c  in DIMACS:
-12542 -12543 -12544  0

c i = 11
c  -2+1 --> -1
c    ( b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧  p_165) -> ( b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0)
c  in CNF:
c    -b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨  b^{15, 12}_2
c    -b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_1
c    -b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨  b^{15, 12}_0
c  in DIMACS:
-12545 -12546  12547 -165  12548 0
-12545 -12546  12547 -165 -12549 0
-12545 -12546  12547 -165  12550 0

c  -1+1 --> 0
c    ( b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0 ∧  p_165) -> (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧ -b^{15, 12}_0)
c  in CNF:
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_2
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_1
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_0
c  in DIMACS:
-12545  12546 -12547 -165 -12548 0
-12545  12546 -12547 -165 -12549 0
-12545  12546 -12547 -165 -12550 0

c  0+1 --> 1
c    (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧  p_165) -> (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0)
c  in CNF:
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_2
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_1
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨  b^{15, 12}_0
c  in DIMACS:
 12545  12546  12547 -165 -12548 0
 12545  12546  12547 -165 -12549 0
 12545  12546  12547 -165  12550 0

c  1+1 --> 2
c    (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0 ∧  p_165) -> (-b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0)
c  in CNF:
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_2
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨  b^{15, 12}_1
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ -p_165 ∨ -b^{15, 12}_0
c  in DIMACS:
 12545  12546 -12547 -165 -12548 0
 12545  12546 -12547 -165  12549 0
 12545  12546 -12547 -165 -12550 0

c  2+1 --> break 
c    (-b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧  p_165) -> break
c  in CNF:
c     b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 12545 -12546  12547 -165 1162 0


c  2-1 --> 1
c    (-b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧ -p_165) -> (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0)
c  in CNF:
c     b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_2
c     b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_1
c     b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨  b^{15, 12}_0
c  in DIMACS:
 12545 -12546  12547  165 -12548 0
 12545 -12546  12547  165 -12549 0
 12545 -12546  12547  165  12550 0

c  1-1 --> 0
c    (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0 ∧ -p_165) -> (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧ -b^{15, 12}_0)
c  in CNF:
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_2
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_1
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_0
c  in DIMACS:
 12545  12546 -12547  165 -12548 0
 12545  12546 -12547  165 -12549 0
 12545  12546 -12547  165 -12550 0

c  0-1 --> -1
c    (-b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧ -p_165) -> ( b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0)
c  in CNF:
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨  b^{15, 12}_2
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_1
c     b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨  b^{15, 12}_0
c  in DIMACS:
 12545  12546  12547  165  12548 0
 12545  12546  12547  165 -12549 0
 12545  12546  12547  165  12550 0

c  -1-1 --> -2
c    ( b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧  b^{15, 11}_0 ∧ -p_165) -> ( b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0)
c  in CNF:
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨  b^{15, 12}_2
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨  b^{15, 12}_1
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨  p_165 ∨ -b^{15, 12}_0
c  in DIMACS:
-12545  12546 -12547  165  12548 0
-12545  12546 -12547  165  12549 0
-12545  12546 -12547  165 -12550 0

c  -2-1 --> break 
c    ( b^{15, 11}_2 ∧  b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨  b^{15, 11}_0 ∨  p_165 ∨ break
c  in DIMACS:
-12545 -12546  12547  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 11}_2 ∧ -b^{15, 11}_1 ∧ -b^{15, 11}_0 ∧ true) 
c  in CNF:
c    -b^{15, 11}_2 ∨  b^{15, 11}_1 ∨  b^{15, 11}_0 ∨ false 
c  in DIMACS:
-12545  12546  12547  0

c  3 does not represent an automaton state.
c    -(-b^{15, 11}_2 ∧  b^{15, 11}_1 ∧  b^{15, 11}_0 ∧ true) 
c  in CNF:
c     b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ false 
c  in DIMACS:
 12545 -12546 -12547  0
c  -3 does not represent an automaton state.
c    -( b^{15, 11}_2 ∧  b^{15, 11}_1 ∧  b^{15, 11}_0 ∧ true) 
c  in CNF:
c    -b^{15, 11}_2 ∨ -b^{15, 11}_1 ∨ -b^{15, 11}_0 ∨ false 
c  in DIMACS:
-12545 -12546 -12547  0

c i = 12
c  -2+1 --> -1
c    ( b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧  p_180) -> ( b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0)
c  in CNF:
c    -b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨  b^{15, 13}_2
c    -b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_1
c    -b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨  b^{15, 13}_0
c  in DIMACS:
-12548 -12549  12550 -180  12551 0
-12548 -12549  12550 -180 -12552 0
-12548 -12549  12550 -180  12553 0

c  -1+1 --> 0
c    ( b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0 ∧  p_180) -> (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧ -b^{15, 13}_0)
c  in CNF:
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_2
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_1
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_0
c  in DIMACS:
-12548  12549 -12550 -180 -12551 0
-12548  12549 -12550 -180 -12552 0
-12548  12549 -12550 -180 -12553 0

c  0+1 --> 1
c    (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧  p_180) -> (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0)
c  in CNF:
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_2
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_1
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨  b^{15, 13}_0
c  in DIMACS:
 12548  12549  12550 -180 -12551 0
 12548  12549  12550 -180 -12552 0
 12548  12549  12550 -180  12553 0

c  1+1 --> 2
c    (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0 ∧  p_180) -> (-b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0)
c  in CNF:
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_2
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨  b^{15, 13}_1
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ -p_180 ∨ -b^{15, 13}_0
c  in DIMACS:
 12548  12549 -12550 -180 -12551 0
 12548  12549 -12550 -180  12552 0
 12548  12549 -12550 -180 -12553 0

c  2+1 --> break 
c    (-b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧  p_180) -> break
c  in CNF:
c     b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 12548 -12549  12550 -180 1162 0


c  2-1 --> 1
c    (-b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧ -p_180) -> (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0)
c  in CNF:
c     b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_2
c     b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_1
c     b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨  b^{15, 13}_0
c  in DIMACS:
 12548 -12549  12550  180 -12551 0
 12548 -12549  12550  180 -12552 0
 12548 -12549  12550  180  12553 0

c  1-1 --> 0
c    (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0 ∧ -p_180) -> (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧ -b^{15, 13}_0)
c  in CNF:
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_2
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_1
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_0
c  in DIMACS:
 12548  12549 -12550  180 -12551 0
 12548  12549 -12550  180 -12552 0
 12548  12549 -12550  180 -12553 0

c  0-1 --> -1
c    (-b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧ -p_180) -> ( b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0)
c  in CNF:
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨  b^{15, 13}_2
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_1
c     b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨  b^{15, 13}_0
c  in DIMACS:
 12548  12549  12550  180  12551 0
 12548  12549  12550  180 -12552 0
 12548  12549  12550  180  12553 0

c  -1-1 --> -2
c    ( b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧  b^{15, 12}_0 ∧ -p_180) -> ( b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0)
c  in CNF:
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨  b^{15, 13}_2
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨  b^{15, 13}_1
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨  p_180 ∨ -b^{15, 13}_0
c  in DIMACS:
-12548  12549 -12550  180  12551 0
-12548  12549 -12550  180  12552 0
-12548  12549 -12550  180 -12553 0

c  -2-1 --> break 
c    ( b^{15, 12}_2 ∧  b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨  b^{15, 12}_0 ∨  p_180 ∨ break
c  in DIMACS:
-12548 -12549  12550  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 12}_2 ∧ -b^{15, 12}_1 ∧ -b^{15, 12}_0 ∧ true) 
c  in CNF:
c    -b^{15, 12}_2 ∨  b^{15, 12}_1 ∨  b^{15, 12}_0 ∨ false 
c  in DIMACS:
-12548  12549  12550  0

c  3 does not represent an automaton state.
c    -(-b^{15, 12}_2 ∧  b^{15, 12}_1 ∧  b^{15, 12}_0 ∧ true) 
c  in CNF:
c     b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ false 
c  in DIMACS:
 12548 -12549 -12550  0
c  -3 does not represent an automaton state.
c    -( b^{15, 12}_2 ∧  b^{15, 12}_1 ∧  b^{15, 12}_0 ∧ true) 
c  in CNF:
c    -b^{15, 12}_2 ∨ -b^{15, 12}_1 ∨ -b^{15, 12}_0 ∨ false 
c  in DIMACS:
-12548 -12549 -12550  0

c i = 13
c  -2+1 --> -1
c    ( b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧  p_195) -> ( b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0)
c  in CNF:
c    -b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨  b^{15, 14}_2
c    -b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_1
c    -b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨  b^{15, 14}_0
c  in DIMACS:
-12551 -12552  12553 -195  12554 0
-12551 -12552  12553 -195 -12555 0
-12551 -12552  12553 -195  12556 0

c  -1+1 --> 0
c    ( b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0 ∧  p_195) -> (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧ -b^{15, 14}_0)
c  in CNF:
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_2
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_1
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_0
c  in DIMACS:
-12551  12552 -12553 -195 -12554 0
-12551  12552 -12553 -195 -12555 0
-12551  12552 -12553 -195 -12556 0

c  0+1 --> 1
c    (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧  p_195) -> (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0)
c  in CNF:
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_2
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_1
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨  b^{15, 14}_0
c  in DIMACS:
 12551  12552  12553 -195 -12554 0
 12551  12552  12553 -195 -12555 0
 12551  12552  12553 -195  12556 0

c  1+1 --> 2
c    (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0 ∧  p_195) -> (-b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0)
c  in CNF:
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_2
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨  b^{15, 14}_1
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ -p_195 ∨ -b^{15, 14}_0
c  in DIMACS:
 12551  12552 -12553 -195 -12554 0
 12551  12552 -12553 -195  12555 0
 12551  12552 -12553 -195 -12556 0

c  2+1 --> break 
c    (-b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧  p_195) -> break
c  in CNF:
c     b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 12551 -12552  12553 -195 1162 0


c  2-1 --> 1
c    (-b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧ -p_195) -> (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0)
c  in CNF:
c     b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_2
c     b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_1
c     b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨  b^{15, 14}_0
c  in DIMACS:
 12551 -12552  12553  195 -12554 0
 12551 -12552  12553  195 -12555 0
 12551 -12552  12553  195  12556 0

c  1-1 --> 0
c    (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0 ∧ -p_195) -> (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧ -b^{15, 14}_0)
c  in CNF:
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_2
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_1
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_0
c  in DIMACS:
 12551  12552 -12553  195 -12554 0
 12551  12552 -12553  195 -12555 0
 12551  12552 -12553  195 -12556 0

c  0-1 --> -1
c    (-b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧ -p_195) -> ( b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0)
c  in CNF:
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨  b^{15, 14}_2
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_1
c     b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨  b^{15, 14}_0
c  in DIMACS:
 12551  12552  12553  195  12554 0
 12551  12552  12553  195 -12555 0
 12551  12552  12553  195  12556 0

c  -1-1 --> -2
c    ( b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧  b^{15, 13}_0 ∧ -p_195) -> ( b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0)
c  in CNF:
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨  b^{15, 14}_2
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨  b^{15, 14}_1
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨  p_195 ∨ -b^{15, 14}_0
c  in DIMACS:
-12551  12552 -12553  195  12554 0
-12551  12552 -12553  195  12555 0
-12551  12552 -12553  195 -12556 0

c  -2-1 --> break 
c    ( b^{15, 13}_2 ∧  b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨  b^{15, 13}_0 ∨  p_195 ∨ break
c  in DIMACS:
-12551 -12552  12553  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 13}_2 ∧ -b^{15, 13}_1 ∧ -b^{15, 13}_0 ∧ true) 
c  in CNF:
c    -b^{15, 13}_2 ∨  b^{15, 13}_1 ∨  b^{15, 13}_0 ∨ false 
c  in DIMACS:
-12551  12552  12553  0

c  3 does not represent an automaton state.
c    -(-b^{15, 13}_2 ∧  b^{15, 13}_1 ∧  b^{15, 13}_0 ∧ true) 
c  in CNF:
c     b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ false 
c  in DIMACS:
 12551 -12552 -12553  0
c  -3 does not represent an automaton state.
c    -( b^{15, 13}_2 ∧  b^{15, 13}_1 ∧  b^{15, 13}_0 ∧ true) 
c  in CNF:
c    -b^{15, 13}_2 ∨ -b^{15, 13}_1 ∨ -b^{15, 13}_0 ∨ false 
c  in DIMACS:
-12551 -12552 -12553  0

c i = 14
c  -2+1 --> -1
c    ( b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧  p_210) -> ( b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0)
c  in CNF:
c    -b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨  b^{15, 15}_2
c    -b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_1
c    -b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨  b^{15, 15}_0
c  in DIMACS:
-12554 -12555  12556 -210  12557 0
-12554 -12555  12556 -210 -12558 0
-12554 -12555  12556 -210  12559 0

c  -1+1 --> 0
c    ( b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0 ∧  p_210) -> (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧ -b^{15, 15}_0)
c  in CNF:
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_2
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_1
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_0
c  in DIMACS:
-12554  12555 -12556 -210 -12557 0
-12554  12555 -12556 -210 -12558 0
-12554  12555 -12556 -210 -12559 0

c  0+1 --> 1
c    (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧  p_210) -> (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0)
c  in CNF:
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_2
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_1
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨  b^{15, 15}_0
c  in DIMACS:
 12554  12555  12556 -210 -12557 0
 12554  12555  12556 -210 -12558 0
 12554  12555  12556 -210  12559 0

c  1+1 --> 2
c    (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0 ∧  p_210) -> (-b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0)
c  in CNF:
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_2
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨  b^{15, 15}_1
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ -p_210 ∨ -b^{15, 15}_0
c  in DIMACS:
 12554  12555 -12556 -210 -12557 0
 12554  12555 -12556 -210  12558 0
 12554  12555 -12556 -210 -12559 0

c  2+1 --> break 
c    (-b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧  p_210) -> break
c  in CNF:
c     b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 12554 -12555  12556 -210 1162 0


c  2-1 --> 1
c    (-b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧ -p_210) -> (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0)
c  in CNF:
c     b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_2
c     b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_1
c     b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨  b^{15, 15}_0
c  in DIMACS:
 12554 -12555  12556  210 -12557 0
 12554 -12555  12556  210 -12558 0
 12554 -12555  12556  210  12559 0

c  1-1 --> 0
c    (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0 ∧ -p_210) -> (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧ -b^{15, 15}_0)
c  in CNF:
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_2
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_1
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_0
c  in DIMACS:
 12554  12555 -12556  210 -12557 0
 12554  12555 -12556  210 -12558 0
 12554  12555 -12556  210 -12559 0

c  0-1 --> -1
c    (-b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧ -p_210) -> ( b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0)
c  in CNF:
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨  b^{15, 15}_2
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_1
c     b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨  b^{15, 15}_0
c  in DIMACS:
 12554  12555  12556  210  12557 0
 12554  12555  12556  210 -12558 0
 12554  12555  12556  210  12559 0

c  -1-1 --> -2
c    ( b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧  b^{15, 14}_0 ∧ -p_210) -> ( b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0)
c  in CNF:
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨  b^{15, 15}_2
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨  b^{15, 15}_1
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨  p_210 ∨ -b^{15, 15}_0
c  in DIMACS:
-12554  12555 -12556  210  12557 0
-12554  12555 -12556  210  12558 0
-12554  12555 -12556  210 -12559 0

c  -2-1 --> break 
c    ( b^{15, 14}_2 ∧  b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨  b^{15, 14}_0 ∨  p_210 ∨ break
c  in DIMACS:
-12554 -12555  12556  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 14}_2 ∧ -b^{15, 14}_1 ∧ -b^{15, 14}_0 ∧ true) 
c  in CNF:
c    -b^{15, 14}_2 ∨  b^{15, 14}_1 ∨  b^{15, 14}_0 ∨ false 
c  in DIMACS:
-12554  12555  12556  0

c  3 does not represent an automaton state.
c    -(-b^{15, 14}_2 ∧  b^{15, 14}_1 ∧  b^{15, 14}_0 ∧ true) 
c  in CNF:
c     b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ false 
c  in DIMACS:
 12554 -12555 -12556  0
c  -3 does not represent an automaton state.
c    -( b^{15, 14}_2 ∧  b^{15, 14}_1 ∧  b^{15, 14}_0 ∧ true) 
c  in CNF:
c    -b^{15, 14}_2 ∨ -b^{15, 14}_1 ∨ -b^{15, 14}_0 ∨ false 
c  in DIMACS:
-12554 -12555 -12556  0

c i = 15
c  -2+1 --> -1
c    ( b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧  p_225) -> ( b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0)
c  in CNF:
c    -b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨  b^{15, 16}_2
c    -b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_1
c    -b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨  b^{15, 16}_0
c  in DIMACS:
-12557 -12558  12559 -225  12560 0
-12557 -12558  12559 -225 -12561 0
-12557 -12558  12559 -225  12562 0

c  -1+1 --> 0
c    ( b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0 ∧  p_225) -> (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧ -b^{15, 16}_0)
c  in CNF:
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_2
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_1
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_0
c  in DIMACS:
-12557  12558 -12559 -225 -12560 0
-12557  12558 -12559 -225 -12561 0
-12557  12558 -12559 -225 -12562 0

c  0+1 --> 1
c    (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧  p_225) -> (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0)
c  in CNF:
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_2
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_1
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨  b^{15, 16}_0
c  in DIMACS:
 12557  12558  12559 -225 -12560 0
 12557  12558  12559 -225 -12561 0
 12557  12558  12559 -225  12562 0

c  1+1 --> 2
c    (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0 ∧  p_225) -> (-b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0)
c  in CNF:
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_2
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨  b^{15, 16}_1
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ -p_225 ∨ -b^{15, 16}_0
c  in DIMACS:
 12557  12558 -12559 -225 -12560 0
 12557  12558 -12559 -225  12561 0
 12557  12558 -12559 -225 -12562 0

c  2+1 --> break 
c    (-b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧  p_225) -> break
c  in CNF:
c     b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 12557 -12558  12559 -225 1162 0


c  2-1 --> 1
c    (-b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧ -p_225) -> (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0)
c  in CNF:
c     b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_2
c     b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_1
c     b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨  b^{15, 16}_0
c  in DIMACS:
 12557 -12558  12559  225 -12560 0
 12557 -12558  12559  225 -12561 0
 12557 -12558  12559  225  12562 0

c  1-1 --> 0
c    (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0 ∧ -p_225) -> (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧ -b^{15, 16}_0)
c  in CNF:
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_2
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_1
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_0
c  in DIMACS:
 12557  12558 -12559  225 -12560 0
 12557  12558 -12559  225 -12561 0
 12557  12558 -12559  225 -12562 0

c  0-1 --> -1
c    (-b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧ -p_225) -> ( b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0)
c  in CNF:
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨  b^{15, 16}_2
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_1
c     b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨  b^{15, 16}_0
c  in DIMACS:
 12557  12558  12559  225  12560 0
 12557  12558  12559  225 -12561 0
 12557  12558  12559  225  12562 0

c  -1-1 --> -2
c    ( b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧  b^{15, 15}_0 ∧ -p_225) -> ( b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0)
c  in CNF:
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨  b^{15, 16}_2
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨  b^{15, 16}_1
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨  p_225 ∨ -b^{15, 16}_0
c  in DIMACS:
-12557  12558 -12559  225  12560 0
-12557  12558 -12559  225  12561 0
-12557  12558 -12559  225 -12562 0

c  -2-1 --> break 
c    ( b^{15, 15}_2 ∧  b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨  b^{15, 15}_0 ∨  p_225 ∨ break
c  in DIMACS:
-12557 -12558  12559  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 15}_2 ∧ -b^{15, 15}_1 ∧ -b^{15, 15}_0 ∧ true) 
c  in CNF:
c    -b^{15, 15}_2 ∨  b^{15, 15}_1 ∨  b^{15, 15}_0 ∨ false 
c  in DIMACS:
-12557  12558  12559  0

c  3 does not represent an automaton state.
c    -(-b^{15, 15}_2 ∧  b^{15, 15}_1 ∧  b^{15, 15}_0 ∧ true) 
c  in CNF:
c     b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ false 
c  in DIMACS:
 12557 -12558 -12559  0
c  -3 does not represent an automaton state.
c    -( b^{15, 15}_2 ∧  b^{15, 15}_1 ∧  b^{15, 15}_0 ∧ true) 
c  in CNF:
c    -b^{15, 15}_2 ∨ -b^{15, 15}_1 ∨ -b^{15, 15}_0 ∨ false 
c  in DIMACS:
-12557 -12558 -12559  0

c i = 16
c  -2+1 --> -1
c    ( b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧  p_240) -> ( b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0)
c  in CNF:
c    -b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨  b^{15, 17}_2
c    -b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_1
c    -b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨  b^{15, 17}_0
c  in DIMACS:
-12560 -12561  12562 -240  12563 0
-12560 -12561  12562 -240 -12564 0
-12560 -12561  12562 -240  12565 0

c  -1+1 --> 0
c    ( b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0 ∧  p_240) -> (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧ -b^{15, 17}_0)
c  in CNF:
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_2
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_1
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_0
c  in DIMACS:
-12560  12561 -12562 -240 -12563 0
-12560  12561 -12562 -240 -12564 0
-12560  12561 -12562 -240 -12565 0

c  0+1 --> 1
c    (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧  p_240) -> (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0)
c  in CNF:
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_2
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_1
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨  b^{15, 17}_0
c  in DIMACS:
 12560  12561  12562 -240 -12563 0
 12560  12561  12562 -240 -12564 0
 12560  12561  12562 -240  12565 0

c  1+1 --> 2
c    (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0 ∧  p_240) -> (-b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0)
c  in CNF:
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_2
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨  b^{15, 17}_1
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ -p_240 ∨ -b^{15, 17}_0
c  in DIMACS:
 12560  12561 -12562 -240 -12563 0
 12560  12561 -12562 -240  12564 0
 12560  12561 -12562 -240 -12565 0

c  2+1 --> break 
c    (-b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧  p_240) -> break
c  in CNF:
c     b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 12560 -12561  12562 -240 1162 0


c  2-1 --> 1
c    (-b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧ -p_240) -> (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0)
c  in CNF:
c     b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_2
c     b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_1
c     b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨  b^{15, 17}_0
c  in DIMACS:
 12560 -12561  12562  240 -12563 0
 12560 -12561  12562  240 -12564 0
 12560 -12561  12562  240  12565 0

c  1-1 --> 0
c    (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0 ∧ -p_240) -> (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧ -b^{15, 17}_0)
c  in CNF:
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_2
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_1
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_0
c  in DIMACS:
 12560  12561 -12562  240 -12563 0
 12560  12561 -12562  240 -12564 0
 12560  12561 -12562  240 -12565 0

c  0-1 --> -1
c    (-b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧ -p_240) -> ( b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0)
c  in CNF:
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨  b^{15, 17}_2
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_1
c     b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨  b^{15, 17}_0
c  in DIMACS:
 12560  12561  12562  240  12563 0
 12560  12561  12562  240 -12564 0
 12560  12561  12562  240  12565 0

c  -1-1 --> -2
c    ( b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧  b^{15, 16}_0 ∧ -p_240) -> ( b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0)
c  in CNF:
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨  b^{15, 17}_2
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨  b^{15, 17}_1
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨  p_240 ∨ -b^{15, 17}_0
c  in DIMACS:
-12560  12561 -12562  240  12563 0
-12560  12561 -12562  240  12564 0
-12560  12561 -12562  240 -12565 0

c  -2-1 --> break 
c    ( b^{15, 16}_2 ∧  b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨  b^{15, 16}_0 ∨  p_240 ∨ break
c  in DIMACS:
-12560 -12561  12562  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 16}_2 ∧ -b^{15, 16}_1 ∧ -b^{15, 16}_0 ∧ true) 
c  in CNF:
c    -b^{15, 16}_2 ∨  b^{15, 16}_1 ∨  b^{15, 16}_0 ∨ false 
c  in DIMACS:
-12560  12561  12562  0

c  3 does not represent an automaton state.
c    -(-b^{15, 16}_2 ∧  b^{15, 16}_1 ∧  b^{15, 16}_0 ∧ true) 
c  in CNF:
c     b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ false 
c  in DIMACS:
 12560 -12561 -12562  0
c  -3 does not represent an automaton state.
c    -( b^{15, 16}_2 ∧  b^{15, 16}_1 ∧  b^{15, 16}_0 ∧ true) 
c  in CNF:
c    -b^{15, 16}_2 ∨ -b^{15, 16}_1 ∨ -b^{15, 16}_0 ∨ false 
c  in DIMACS:
-12560 -12561 -12562  0

c i = 17
c  -2+1 --> -1
c    ( b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧  p_255) -> ( b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0)
c  in CNF:
c    -b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨  b^{15, 18}_2
c    -b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_1
c    -b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨  b^{15, 18}_0
c  in DIMACS:
-12563 -12564  12565 -255  12566 0
-12563 -12564  12565 -255 -12567 0
-12563 -12564  12565 -255  12568 0

c  -1+1 --> 0
c    ( b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0 ∧  p_255) -> (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧ -b^{15, 18}_0)
c  in CNF:
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_2
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_1
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_0
c  in DIMACS:
-12563  12564 -12565 -255 -12566 0
-12563  12564 -12565 -255 -12567 0
-12563  12564 -12565 -255 -12568 0

c  0+1 --> 1
c    (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧  p_255) -> (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0)
c  in CNF:
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_2
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_1
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨  b^{15, 18}_0
c  in DIMACS:
 12563  12564  12565 -255 -12566 0
 12563  12564  12565 -255 -12567 0
 12563  12564  12565 -255  12568 0

c  1+1 --> 2
c    (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0 ∧  p_255) -> (-b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0)
c  in CNF:
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_2
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨  b^{15, 18}_1
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ -p_255 ∨ -b^{15, 18}_0
c  in DIMACS:
 12563  12564 -12565 -255 -12566 0
 12563  12564 -12565 -255  12567 0
 12563  12564 -12565 -255 -12568 0

c  2+1 --> break 
c    (-b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧  p_255) -> break
c  in CNF:
c     b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 12563 -12564  12565 -255 1162 0


c  2-1 --> 1
c    (-b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧ -p_255) -> (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0)
c  in CNF:
c     b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_2
c     b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_1
c     b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨  b^{15, 18}_0
c  in DIMACS:
 12563 -12564  12565  255 -12566 0
 12563 -12564  12565  255 -12567 0
 12563 -12564  12565  255  12568 0

c  1-1 --> 0
c    (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0 ∧ -p_255) -> (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧ -b^{15, 18}_0)
c  in CNF:
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_2
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_1
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_0
c  in DIMACS:
 12563  12564 -12565  255 -12566 0
 12563  12564 -12565  255 -12567 0
 12563  12564 -12565  255 -12568 0

c  0-1 --> -1
c    (-b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧ -p_255) -> ( b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0)
c  in CNF:
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨  b^{15, 18}_2
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_1
c     b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨  b^{15, 18}_0
c  in DIMACS:
 12563  12564  12565  255  12566 0
 12563  12564  12565  255 -12567 0
 12563  12564  12565  255  12568 0

c  -1-1 --> -2
c    ( b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧  b^{15, 17}_0 ∧ -p_255) -> ( b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0)
c  in CNF:
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨  b^{15, 18}_2
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨  b^{15, 18}_1
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨  p_255 ∨ -b^{15, 18}_0
c  in DIMACS:
-12563  12564 -12565  255  12566 0
-12563  12564 -12565  255  12567 0
-12563  12564 -12565  255 -12568 0

c  -2-1 --> break 
c    ( b^{15, 17}_2 ∧  b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨  b^{15, 17}_0 ∨  p_255 ∨ break
c  in DIMACS:
-12563 -12564  12565  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 17}_2 ∧ -b^{15, 17}_1 ∧ -b^{15, 17}_0 ∧ true) 
c  in CNF:
c    -b^{15, 17}_2 ∨  b^{15, 17}_1 ∨  b^{15, 17}_0 ∨ false 
c  in DIMACS:
-12563  12564  12565  0

c  3 does not represent an automaton state.
c    -(-b^{15, 17}_2 ∧  b^{15, 17}_1 ∧  b^{15, 17}_0 ∧ true) 
c  in CNF:
c     b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ false 
c  in DIMACS:
 12563 -12564 -12565  0
c  -3 does not represent an automaton state.
c    -( b^{15, 17}_2 ∧  b^{15, 17}_1 ∧  b^{15, 17}_0 ∧ true) 
c  in CNF:
c    -b^{15, 17}_2 ∨ -b^{15, 17}_1 ∨ -b^{15, 17}_0 ∨ false 
c  in DIMACS:
-12563 -12564 -12565  0

c i = 18
c  -2+1 --> -1
c    ( b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧  p_270) -> ( b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0)
c  in CNF:
c    -b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨  b^{15, 19}_2
c    -b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_1
c    -b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨  b^{15, 19}_0
c  in DIMACS:
-12566 -12567  12568 -270  12569 0
-12566 -12567  12568 -270 -12570 0
-12566 -12567  12568 -270  12571 0

c  -1+1 --> 0
c    ( b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0 ∧  p_270) -> (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧ -b^{15, 19}_0)
c  in CNF:
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_2
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_1
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_0
c  in DIMACS:
-12566  12567 -12568 -270 -12569 0
-12566  12567 -12568 -270 -12570 0
-12566  12567 -12568 -270 -12571 0

c  0+1 --> 1
c    (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧  p_270) -> (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0)
c  in CNF:
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_2
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_1
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨  b^{15, 19}_0
c  in DIMACS:
 12566  12567  12568 -270 -12569 0
 12566  12567  12568 -270 -12570 0
 12566  12567  12568 -270  12571 0

c  1+1 --> 2
c    (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0 ∧  p_270) -> (-b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0)
c  in CNF:
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_2
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨  b^{15, 19}_1
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ -p_270 ∨ -b^{15, 19}_0
c  in DIMACS:
 12566  12567 -12568 -270 -12569 0
 12566  12567 -12568 -270  12570 0
 12566  12567 -12568 -270 -12571 0

c  2+1 --> break 
c    (-b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧  p_270) -> break
c  in CNF:
c     b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 12566 -12567  12568 -270 1162 0


c  2-1 --> 1
c    (-b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧ -p_270) -> (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0)
c  in CNF:
c     b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_2
c     b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_1
c     b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨  b^{15, 19}_0
c  in DIMACS:
 12566 -12567  12568  270 -12569 0
 12566 -12567  12568  270 -12570 0
 12566 -12567  12568  270  12571 0

c  1-1 --> 0
c    (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0 ∧ -p_270) -> (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧ -b^{15, 19}_0)
c  in CNF:
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_2
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_1
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_0
c  in DIMACS:
 12566  12567 -12568  270 -12569 0
 12566  12567 -12568  270 -12570 0
 12566  12567 -12568  270 -12571 0

c  0-1 --> -1
c    (-b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧ -p_270) -> ( b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0)
c  in CNF:
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨  b^{15, 19}_2
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_1
c     b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨  b^{15, 19}_0
c  in DIMACS:
 12566  12567  12568  270  12569 0
 12566  12567  12568  270 -12570 0
 12566  12567  12568  270  12571 0

c  -1-1 --> -2
c    ( b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧  b^{15, 18}_0 ∧ -p_270) -> ( b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0)
c  in CNF:
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨  b^{15, 19}_2
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨  b^{15, 19}_1
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨  p_270 ∨ -b^{15, 19}_0
c  in DIMACS:
-12566  12567 -12568  270  12569 0
-12566  12567 -12568  270  12570 0
-12566  12567 -12568  270 -12571 0

c  -2-1 --> break 
c    ( b^{15, 18}_2 ∧  b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨  b^{15, 18}_0 ∨  p_270 ∨ break
c  in DIMACS:
-12566 -12567  12568  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 18}_2 ∧ -b^{15, 18}_1 ∧ -b^{15, 18}_0 ∧ true) 
c  in CNF:
c    -b^{15, 18}_2 ∨  b^{15, 18}_1 ∨  b^{15, 18}_0 ∨ false 
c  in DIMACS:
-12566  12567  12568  0

c  3 does not represent an automaton state.
c    -(-b^{15, 18}_2 ∧  b^{15, 18}_1 ∧  b^{15, 18}_0 ∧ true) 
c  in CNF:
c     b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ false 
c  in DIMACS:
 12566 -12567 -12568  0
c  -3 does not represent an automaton state.
c    -( b^{15, 18}_2 ∧  b^{15, 18}_1 ∧  b^{15, 18}_0 ∧ true) 
c  in CNF:
c    -b^{15, 18}_2 ∨ -b^{15, 18}_1 ∨ -b^{15, 18}_0 ∨ false 
c  in DIMACS:
-12566 -12567 -12568  0

c i = 19
c  -2+1 --> -1
c    ( b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧  p_285) -> ( b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0)
c  in CNF:
c    -b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨  b^{15, 20}_2
c    -b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_1
c    -b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨  b^{15, 20}_0
c  in DIMACS:
-12569 -12570  12571 -285  12572 0
-12569 -12570  12571 -285 -12573 0
-12569 -12570  12571 -285  12574 0

c  -1+1 --> 0
c    ( b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0 ∧  p_285) -> (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧ -b^{15, 20}_0)
c  in CNF:
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_2
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_1
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_0
c  in DIMACS:
-12569  12570 -12571 -285 -12572 0
-12569  12570 -12571 -285 -12573 0
-12569  12570 -12571 -285 -12574 0

c  0+1 --> 1
c    (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧  p_285) -> (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0)
c  in CNF:
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_2
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_1
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨  b^{15, 20}_0
c  in DIMACS:
 12569  12570  12571 -285 -12572 0
 12569  12570  12571 -285 -12573 0
 12569  12570  12571 -285  12574 0

c  1+1 --> 2
c    (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0 ∧  p_285) -> (-b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0)
c  in CNF:
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_2
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨  b^{15, 20}_1
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ -p_285 ∨ -b^{15, 20}_0
c  in DIMACS:
 12569  12570 -12571 -285 -12572 0
 12569  12570 -12571 -285  12573 0
 12569  12570 -12571 -285 -12574 0

c  2+1 --> break 
c    (-b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧  p_285) -> break
c  in CNF:
c     b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 12569 -12570  12571 -285 1162 0


c  2-1 --> 1
c    (-b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧ -p_285) -> (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0)
c  in CNF:
c     b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_2
c     b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_1
c     b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨  b^{15, 20}_0
c  in DIMACS:
 12569 -12570  12571  285 -12572 0
 12569 -12570  12571  285 -12573 0
 12569 -12570  12571  285  12574 0

c  1-1 --> 0
c    (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0 ∧ -p_285) -> (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧ -b^{15, 20}_0)
c  in CNF:
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_2
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_1
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_0
c  in DIMACS:
 12569  12570 -12571  285 -12572 0
 12569  12570 -12571  285 -12573 0
 12569  12570 -12571  285 -12574 0

c  0-1 --> -1
c    (-b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧ -p_285) -> ( b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0)
c  in CNF:
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨  b^{15, 20}_2
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_1
c     b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨  b^{15, 20}_0
c  in DIMACS:
 12569  12570  12571  285  12572 0
 12569  12570  12571  285 -12573 0
 12569  12570  12571  285  12574 0

c  -1-1 --> -2
c    ( b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧  b^{15, 19}_0 ∧ -p_285) -> ( b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0)
c  in CNF:
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨  b^{15, 20}_2
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨  b^{15, 20}_1
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨  p_285 ∨ -b^{15, 20}_0
c  in DIMACS:
-12569  12570 -12571  285  12572 0
-12569  12570 -12571  285  12573 0
-12569  12570 -12571  285 -12574 0

c  -2-1 --> break 
c    ( b^{15, 19}_2 ∧  b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨  b^{15, 19}_0 ∨  p_285 ∨ break
c  in DIMACS:
-12569 -12570  12571  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 19}_2 ∧ -b^{15, 19}_1 ∧ -b^{15, 19}_0 ∧ true) 
c  in CNF:
c    -b^{15, 19}_2 ∨  b^{15, 19}_1 ∨  b^{15, 19}_0 ∨ false 
c  in DIMACS:
-12569  12570  12571  0

c  3 does not represent an automaton state.
c    -(-b^{15, 19}_2 ∧  b^{15, 19}_1 ∧  b^{15, 19}_0 ∧ true) 
c  in CNF:
c     b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ false 
c  in DIMACS:
 12569 -12570 -12571  0
c  -3 does not represent an automaton state.
c    -( b^{15, 19}_2 ∧  b^{15, 19}_1 ∧  b^{15, 19}_0 ∧ true) 
c  in CNF:
c    -b^{15, 19}_2 ∨ -b^{15, 19}_1 ∨ -b^{15, 19}_0 ∨ false 
c  in DIMACS:
-12569 -12570 -12571  0

c i = 20
c  -2+1 --> -1
c    ( b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧  p_300) -> ( b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0)
c  in CNF:
c    -b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨  b^{15, 21}_2
c    -b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_1
c    -b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨  b^{15, 21}_0
c  in DIMACS:
-12572 -12573  12574 -300  12575 0
-12572 -12573  12574 -300 -12576 0
-12572 -12573  12574 -300  12577 0

c  -1+1 --> 0
c    ( b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0 ∧  p_300) -> (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧ -b^{15, 21}_0)
c  in CNF:
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_2
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_1
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_0
c  in DIMACS:
-12572  12573 -12574 -300 -12575 0
-12572  12573 -12574 -300 -12576 0
-12572  12573 -12574 -300 -12577 0

c  0+1 --> 1
c    (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧  p_300) -> (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0)
c  in CNF:
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_2
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_1
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨  b^{15, 21}_0
c  in DIMACS:
 12572  12573  12574 -300 -12575 0
 12572  12573  12574 -300 -12576 0
 12572  12573  12574 -300  12577 0

c  1+1 --> 2
c    (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0 ∧  p_300) -> (-b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0)
c  in CNF:
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_2
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨  b^{15, 21}_1
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ -p_300 ∨ -b^{15, 21}_0
c  in DIMACS:
 12572  12573 -12574 -300 -12575 0
 12572  12573 -12574 -300  12576 0
 12572  12573 -12574 -300 -12577 0

c  2+1 --> break 
c    (-b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧  p_300) -> break
c  in CNF:
c     b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 12572 -12573  12574 -300 1162 0


c  2-1 --> 1
c    (-b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧ -p_300) -> (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0)
c  in CNF:
c     b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_2
c     b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_1
c     b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨  b^{15, 21}_0
c  in DIMACS:
 12572 -12573  12574  300 -12575 0
 12572 -12573  12574  300 -12576 0
 12572 -12573  12574  300  12577 0

c  1-1 --> 0
c    (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0 ∧ -p_300) -> (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧ -b^{15, 21}_0)
c  in CNF:
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_2
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_1
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_0
c  in DIMACS:
 12572  12573 -12574  300 -12575 0
 12572  12573 -12574  300 -12576 0
 12572  12573 -12574  300 -12577 0

c  0-1 --> -1
c    (-b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧ -p_300) -> ( b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0)
c  in CNF:
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨  b^{15, 21}_2
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_1
c     b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨  b^{15, 21}_0
c  in DIMACS:
 12572  12573  12574  300  12575 0
 12572  12573  12574  300 -12576 0
 12572  12573  12574  300  12577 0

c  -1-1 --> -2
c    ( b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧  b^{15, 20}_0 ∧ -p_300) -> ( b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0)
c  in CNF:
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨  b^{15, 21}_2
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨  b^{15, 21}_1
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨  p_300 ∨ -b^{15, 21}_0
c  in DIMACS:
-12572  12573 -12574  300  12575 0
-12572  12573 -12574  300  12576 0
-12572  12573 -12574  300 -12577 0

c  -2-1 --> break 
c    ( b^{15, 20}_2 ∧  b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨  b^{15, 20}_0 ∨  p_300 ∨ break
c  in DIMACS:
-12572 -12573  12574  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 20}_2 ∧ -b^{15, 20}_1 ∧ -b^{15, 20}_0 ∧ true) 
c  in CNF:
c    -b^{15, 20}_2 ∨  b^{15, 20}_1 ∨  b^{15, 20}_0 ∨ false 
c  in DIMACS:
-12572  12573  12574  0

c  3 does not represent an automaton state.
c    -(-b^{15, 20}_2 ∧  b^{15, 20}_1 ∧  b^{15, 20}_0 ∧ true) 
c  in CNF:
c     b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ false 
c  in DIMACS:
 12572 -12573 -12574  0
c  -3 does not represent an automaton state.
c    -( b^{15, 20}_2 ∧  b^{15, 20}_1 ∧  b^{15, 20}_0 ∧ true) 
c  in CNF:
c    -b^{15, 20}_2 ∨ -b^{15, 20}_1 ∨ -b^{15, 20}_0 ∨ false 
c  in DIMACS:
-12572 -12573 -12574  0

c i = 21
c  -2+1 --> -1
c    ( b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧  p_315) -> ( b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0)
c  in CNF:
c    -b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨  b^{15, 22}_2
c    -b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_1
c    -b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨  b^{15, 22}_0
c  in DIMACS:
-12575 -12576  12577 -315  12578 0
-12575 -12576  12577 -315 -12579 0
-12575 -12576  12577 -315  12580 0

c  -1+1 --> 0
c    ( b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0 ∧  p_315) -> (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧ -b^{15, 22}_0)
c  in CNF:
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_2
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_1
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_0
c  in DIMACS:
-12575  12576 -12577 -315 -12578 0
-12575  12576 -12577 -315 -12579 0
-12575  12576 -12577 -315 -12580 0

c  0+1 --> 1
c    (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧  p_315) -> (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0)
c  in CNF:
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_2
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_1
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨  b^{15, 22}_0
c  in DIMACS:
 12575  12576  12577 -315 -12578 0
 12575  12576  12577 -315 -12579 0
 12575  12576  12577 -315  12580 0

c  1+1 --> 2
c    (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0 ∧  p_315) -> (-b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0)
c  in CNF:
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_2
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨  b^{15, 22}_1
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ -p_315 ∨ -b^{15, 22}_0
c  in DIMACS:
 12575  12576 -12577 -315 -12578 0
 12575  12576 -12577 -315  12579 0
 12575  12576 -12577 -315 -12580 0

c  2+1 --> break 
c    (-b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧  p_315) -> break
c  in CNF:
c     b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 12575 -12576  12577 -315 1162 0


c  2-1 --> 1
c    (-b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧ -p_315) -> (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0)
c  in CNF:
c     b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_2
c     b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_1
c     b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨  b^{15, 22}_0
c  in DIMACS:
 12575 -12576  12577  315 -12578 0
 12575 -12576  12577  315 -12579 0
 12575 -12576  12577  315  12580 0

c  1-1 --> 0
c    (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0 ∧ -p_315) -> (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧ -b^{15, 22}_0)
c  in CNF:
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_2
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_1
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_0
c  in DIMACS:
 12575  12576 -12577  315 -12578 0
 12575  12576 -12577  315 -12579 0
 12575  12576 -12577  315 -12580 0

c  0-1 --> -1
c    (-b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧ -p_315) -> ( b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0)
c  in CNF:
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨  b^{15, 22}_2
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_1
c     b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨  b^{15, 22}_0
c  in DIMACS:
 12575  12576  12577  315  12578 0
 12575  12576  12577  315 -12579 0
 12575  12576  12577  315  12580 0

c  -1-1 --> -2
c    ( b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧  b^{15, 21}_0 ∧ -p_315) -> ( b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0)
c  in CNF:
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨  b^{15, 22}_2
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨  b^{15, 22}_1
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨  p_315 ∨ -b^{15, 22}_0
c  in DIMACS:
-12575  12576 -12577  315  12578 0
-12575  12576 -12577  315  12579 0
-12575  12576 -12577  315 -12580 0

c  -2-1 --> break 
c    ( b^{15, 21}_2 ∧  b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨  b^{15, 21}_0 ∨  p_315 ∨ break
c  in DIMACS:
-12575 -12576  12577  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 21}_2 ∧ -b^{15, 21}_1 ∧ -b^{15, 21}_0 ∧ true) 
c  in CNF:
c    -b^{15, 21}_2 ∨  b^{15, 21}_1 ∨  b^{15, 21}_0 ∨ false 
c  in DIMACS:
-12575  12576  12577  0

c  3 does not represent an automaton state.
c    -(-b^{15, 21}_2 ∧  b^{15, 21}_1 ∧  b^{15, 21}_0 ∧ true) 
c  in CNF:
c     b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ false 
c  in DIMACS:
 12575 -12576 -12577  0
c  -3 does not represent an automaton state.
c    -( b^{15, 21}_2 ∧  b^{15, 21}_1 ∧  b^{15, 21}_0 ∧ true) 
c  in CNF:
c    -b^{15, 21}_2 ∨ -b^{15, 21}_1 ∨ -b^{15, 21}_0 ∨ false 
c  in DIMACS:
-12575 -12576 -12577  0

c i = 22
c  -2+1 --> -1
c    ( b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧  p_330) -> ( b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0)
c  in CNF:
c    -b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨  b^{15, 23}_2
c    -b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_1
c    -b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨  b^{15, 23}_0
c  in DIMACS:
-12578 -12579  12580 -330  12581 0
-12578 -12579  12580 -330 -12582 0
-12578 -12579  12580 -330  12583 0

c  -1+1 --> 0
c    ( b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0 ∧  p_330) -> (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧ -b^{15, 23}_0)
c  in CNF:
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_2
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_1
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_0
c  in DIMACS:
-12578  12579 -12580 -330 -12581 0
-12578  12579 -12580 -330 -12582 0
-12578  12579 -12580 -330 -12583 0

c  0+1 --> 1
c    (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧  p_330) -> (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0)
c  in CNF:
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_2
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_1
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨  b^{15, 23}_0
c  in DIMACS:
 12578  12579  12580 -330 -12581 0
 12578  12579  12580 -330 -12582 0
 12578  12579  12580 -330  12583 0

c  1+1 --> 2
c    (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0 ∧  p_330) -> (-b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0)
c  in CNF:
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_2
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨  b^{15, 23}_1
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ -p_330 ∨ -b^{15, 23}_0
c  in DIMACS:
 12578  12579 -12580 -330 -12581 0
 12578  12579 -12580 -330  12582 0
 12578  12579 -12580 -330 -12583 0

c  2+1 --> break 
c    (-b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧  p_330) -> break
c  in CNF:
c     b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 12578 -12579  12580 -330 1162 0


c  2-1 --> 1
c    (-b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧ -p_330) -> (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0)
c  in CNF:
c     b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_2
c     b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_1
c     b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨  b^{15, 23}_0
c  in DIMACS:
 12578 -12579  12580  330 -12581 0
 12578 -12579  12580  330 -12582 0
 12578 -12579  12580  330  12583 0

c  1-1 --> 0
c    (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0 ∧ -p_330) -> (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧ -b^{15, 23}_0)
c  in CNF:
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_2
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_1
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_0
c  in DIMACS:
 12578  12579 -12580  330 -12581 0
 12578  12579 -12580  330 -12582 0
 12578  12579 -12580  330 -12583 0

c  0-1 --> -1
c    (-b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧ -p_330) -> ( b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0)
c  in CNF:
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨  b^{15, 23}_2
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_1
c     b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨  b^{15, 23}_0
c  in DIMACS:
 12578  12579  12580  330  12581 0
 12578  12579  12580  330 -12582 0
 12578  12579  12580  330  12583 0

c  -1-1 --> -2
c    ( b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧  b^{15, 22}_0 ∧ -p_330) -> ( b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0)
c  in CNF:
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨  b^{15, 23}_2
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨  b^{15, 23}_1
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨  p_330 ∨ -b^{15, 23}_0
c  in DIMACS:
-12578  12579 -12580  330  12581 0
-12578  12579 -12580  330  12582 0
-12578  12579 -12580  330 -12583 0

c  -2-1 --> break 
c    ( b^{15, 22}_2 ∧  b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨  b^{15, 22}_0 ∨  p_330 ∨ break
c  in DIMACS:
-12578 -12579  12580  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 22}_2 ∧ -b^{15, 22}_1 ∧ -b^{15, 22}_0 ∧ true) 
c  in CNF:
c    -b^{15, 22}_2 ∨  b^{15, 22}_1 ∨  b^{15, 22}_0 ∨ false 
c  in DIMACS:
-12578  12579  12580  0

c  3 does not represent an automaton state.
c    -(-b^{15, 22}_2 ∧  b^{15, 22}_1 ∧  b^{15, 22}_0 ∧ true) 
c  in CNF:
c     b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ false 
c  in DIMACS:
 12578 -12579 -12580  0
c  -3 does not represent an automaton state.
c    -( b^{15, 22}_2 ∧  b^{15, 22}_1 ∧  b^{15, 22}_0 ∧ true) 
c  in CNF:
c    -b^{15, 22}_2 ∨ -b^{15, 22}_1 ∨ -b^{15, 22}_0 ∨ false 
c  in DIMACS:
-12578 -12579 -12580  0

c i = 23
c  -2+1 --> -1
c    ( b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧  p_345) -> ( b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0)
c  in CNF:
c    -b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨  b^{15, 24}_2
c    -b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_1
c    -b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨  b^{15, 24}_0
c  in DIMACS:
-12581 -12582  12583 -345  12584 0
-12581 -12582  12583 -345 -12585 0
-12581 -12582  12583 -345  12586 0

c  -1+1 --> 0
c    ( b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0 ∧  p_345) -> (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧ -b^{15, 24}_0)
c  in CNF:
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_2
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_1
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_0
c  in DIMACS:
-12581  12582 -12583 -345 -12584 0
-12581  12582 -12583 -345 -12585 0
-12581  12582 -12583 -345 -12586 0

c  0+1 --> 1
c    (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧  p_345) -> (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0)
c  in CNF:
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_2
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_1
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨  b^{15, 24}_0
c  in DIMACS:
 12581  12582  12583 -345 -12584 0
 12581  12582  12583 -345 -12585 0
 12581  12582  12583 -345  12586 0

c  1+1 --> 2
c    (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0 ∧  p_345) -> (-b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0)
c  in CNF:
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_2
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨  b^{15, 24}_1
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ -p_345 ∨ -b^{15, 24}_0
c  in DIMACS:
 12581  12582 -12583 -345 -12584 0
 12581  12582 -12583 -345  12585 0
 12581  12582 -12583 -345 -12586 0

c  2+1 --> break 
c    (-b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧  p_345) -> break
c  in CNF:
c     b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 12581 -12582  12583 -345 1162 0


c  2-1 --> 1
c    (-b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧ -p_345) -> (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0)
c  in CNF:
c     b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_2
c     b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_1
c     b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨  b^{15, 24}_0
c  in DIMACS:
 12581 -12582  12583  345 -12584 0
 12581 -12582  12583  345 -12585 0
 12581 -12582  12583  345  12586 0

c  1-1 --> 0
c    (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0 ∧ -p_345) -> (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧ -b^{15, 24}_0)
c  in CNF:
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_2
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_1
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_0
c  in DIMACS:
 12581  12582 -12583  345 -12584 0
 12581  12582 -12583  345 -12585 0
 12581  12582 -12583  345 -12586 0

c  0-1 --> -1
c    (-b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧ -p_345) -> ( b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0)
c  in CNF:
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨  b^{15, 24}_2
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_1
c     b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨  b^{15, 24}_0
c  in DIMACS:
 12581  12582  12583  345  12584 0
 12581  12582  12583  345 -12585 0
 12581  12582  12583  345  12586 0

c  -1-1 --> -2
c    ( b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧  b^{15, 23}_0 ∧ -p_345) -> ( b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0)
c  in CNF:
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨  b^{15, 24}_2
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨  b^{15, 24}_1
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨  p_345 ∨ -b^{15, 24}_0
c  in DIMACS:
-12581  12582 -12583  345  12584 0
-12581  12582 -12583  345  12585 0
-12581  12582 -12583  345 -12586 0

c  -2-1 --> break 
c    ( b^{15, 23}_2 ∧  b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨  b^{15, 23}_0 ∨  p_345 ∨ break
c  in DIMACS:
-12581 -12582  12583  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 23}_2 ∧ -b^{15, 23}_1 ∧ -b^{15, 23}_0 ∧ true) 
c  in CNF:
c    -b^{15, 23}_2 ∨  b^{15, 23}_1 ∨  b^{15, 23}_0 ∨ false 
c  in DIMACS:
-12581  12582  12583  0

c  3 does not represent an automaton state.
c    -(-b^{15, 23}_2 ∧  b^{15, 23}_1 ∧  b^{15, 23}_0 ∧ true) 
c  in CNF:
c     b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ false 
c  in DIMACS:
 12581 -12582 -12583  0
c  -3 does not represent an automaton state.
c    -( b^{15, 23}_2 ∧  b^{15, 23}_1 ∧  b^{15, 23}_0 ∧ true) 
c  in CNF:
c    -b^{15, 23}_2 ∨ -b^{15, 23}_1 ∨ -b^{15, 23}_0 ∨ false 
c  in DIMACS:
-12581 -12582 -12583  0

c i = 24
c  -2+1 --> -1
c    ( b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧  p_360) -> ( b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0)
c  in CNF:
c    -b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨  b^{15, 25}_2
c    -b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_1
c    -b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨  b^{15, 25}_0
c  in DIMACS:
-12584 -12585  12586 -360  12587 0
-12584 -12585  12586 -360 -12588 0
-12584 -12585  12586 -360  12589 0

c  -1+1 --> 0
c    ( b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0 ∧  p_360) -> (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧ -b^{15, 25}_0)
c  in CNF:
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_2
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_1
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_0
c  in DIMACS:
-12584  12585 -12586 -360 -12587 0
-12584  12585 -12586 -360 -12588 0
-12584  12585 -12586 -360 -12589 0

c  0+1 --> 1
c    (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧  p_360) -> (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0)
c  in CNF:
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_2
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_1
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨  b^{15, 25}_0
c  in DIMACS:
 12584  12585  12586 -360 -12587 0
 12584  12585  12586 -360 -12588 0
 12584  12585  12586 -360  12589 0

c  1+1 --> 2
c    (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0 ∧  p_360) -> (-b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0)
c  in CNF:
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_2
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨  b^{15, 25}_1
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ -p_360 ∨ -b^{15, 25}_0
c  in DIMACS:
 12584  12585 -12586 -360 -12587 0
 12584  12585 -12586 -360  12588 0
 12584  12585 -12586 -360 -12589 0

c  2+1 --> break 
c    (-b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧  p_360) -> break
c  in CNF:
c     b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 12584 -12585  12586 -360 1162 0


c  2-1 --> 1
c    (-b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧ -p_360) -> (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0)
c  in CNF:
c     b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_2
c     b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_1
c     b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨  b^{15, 25}_0
c  in DIMACS:
 12584 -12585  12586  360 -12587 0
 12584 -12585  12586  360 -12588 0
 12584 -12585  12586  360  12589 0

c  1-1 --> 0
c    (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0 ∧ -p_360) -> (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧ -b^{15, 25}_0)
c  in CNF:
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_2
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_1
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_0
c  in DIMACS:
 12584  12585 -12586  360 -12587 0
 12584  12585 -12586  360 -12588 0
 12584  12585 -12586  360 -12589 0

c  0-1 --> -1
c    (-b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧ -p_360) -> ( b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0)
c  in CNF:
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨  b^{15, 25}_2
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_1
c     b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨  b^{15, 25}_0
c  in DIMACS:
 12584  12585  12586  360  12587 0
 12584  12585  12586  360 -12588 0
 12584  12585  12586  360  12589 0

c  -1-1 --> -2
c    ( b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧  b^{15, 24}_0 ∧ -p_360) -> ( b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0)
c  in CNF:
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨  b^{15, 25}_2
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨  b^{15, 25}_1
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨  p_360 ∨ -b^{15, 25}_0
c  in DIMACS:
-12584  12585 -12586  360  12587 0
-12584  12585 -12586  360  12588 0
-12584  12585 -12586  360 -12589 0

c  -2-1 --> break 
c    ( b^{15, 24}_2 ∧  b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨  b^{15, 24}_0 ∨  p_360 ∨ break
c  in DIMACS:
-12584 -12585  12586  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 24}_2 ∧ -b^{15, 24}_1 ∧ -b^{15, 24}_0 ∧ true) 
c  in CNF:
c    -b^{15, 24}_2 ∨  b^{15, 24}_1 ∨  b^{15, 24}_0 ∨ false 
c  in DIMACS:
-12584  12585  12586  0

c  3 does not represent an automaton state.
c    -(-b^{15, 24}_2 ∧  b^{15, 24}_1 ∧  b^{15, 24}_0 ∧ true) 
c  in CNF:
c     b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ false 
c  in DIMACS:
 12584 -12585 -12586  0
c  -3 does not represent an automaton state.
c    -( b^{15, 24}_2 ∧  b^{15, 24}_1 ∧  b^{15, 24}_0 ∧ true) 
c  in CNF:
c    -b^{15, 24}_2 ∨ -b^{15, 24}_1 ∨ -b^{15, 24}_0 ∨ false 
c  in DIMACS:
-12584 -12585 -12586  0

c i = 25
c  -2+1 --> -1
c    ( b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧  p_375) -> ( b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0)
c  in CNF:
c    -b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨  b^{15, 26}_2
c    -b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_1
c    -b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨  b^{15, 26}_0
c  in DIMACS:
-12587 -12588  12589 -375  12590 0
-12587 -12588  12589 -375 -12591 0
-12587 -12588  12589 -375  12592 0

c  -1+1 --> 0
c    ( b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0 ∧  p_375) -> (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧ -b^{15, 26}_0)
c  in CNF:
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_2
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_1
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_0
c  in DIMACS:
-12587  12588 -12589 -375 -12590 0
-12587  12588 -12589 -375 -12591 0
-12587  12588 -12589 -375 -12592 0

c  0+1 --> 1
c    (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧  p_375) -> (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0)
c  in CNF:
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_2
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_1
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨  b^{15, 26}_0
c  in DIMACS:
 12587  12588  12589 -375 -12590 0
 12587  12588  12589 -375 -12591 0
 12587  12588  12589 -375  12592 0

c  1+1 --> 2
c    (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0 ∧  p_375) -> (-b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0)
c  in CNF:
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_2
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨  b^{15, 26}_1
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ -p_375 ∨ -b^{15, 26}_0
c  in DIMACS:
 12587  12588 -12589 -375 -12590 0
 12587  12588 -12589 -375  12591 0
 12587  12588 -12589 -375 -12592 0

c  2+1 --> break 
c    (-b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧  p_375) -> break
c  in CNF:
c     b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 12587 -12588  12589 -375 1162 0


c  2-1 --> 1
c    (-b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧ -p_375) -> (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0)
c  in CNF:
c     b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_2
c     b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_1
c     b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨  b^{15, 26}_0
c  in DIMACS:
 12587 -12588  12589  375 -12590 0
 12587 -12588  12589  375 -12591 0
 12587 -12588  12589  375  12592 0

c  1-1 --> 0
c    (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0 ∧ -p_375) -> (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧ -b^{15, 26}_0)
c  in CNF:
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_2
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_1
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_0
c  in DIMACS:
 12587  12588 -12589  375 -12590 0
 12587  12588 -12589  375 -12591 0
 12587  12588 -12589  375 -12592 0

c  0-1 --> -1
c    (-b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧ -p_375) -> ( b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0)
c  in CNF:
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨  b^{15, 26}_2
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_1
c     b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨  b^{15, 26}_0
c  in DIMACS:
 12587  12588  12589  375  12590 0
 12587  12588  12589  375 -12591 0
 12587  12588  12589  375  12592 0

c  -1-1 --> -2
c    ( b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧  b^{15, 25}_0 ∧ -p_375) -> ( b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0)
c  in CNF:
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨  b^{15, 26}_2
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨  b^{15, 26}_1
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨  p_375 ∨ -b^{15, 26}_0
c  in DIMACS:
-12587  12588 -12589  375  12590 0
-12587  12588 -12589  375  12591 0
-12587  12588 -12589  375 -12592 0

c  -2-1 --> break 
c    ( b^{15, 25}_2 ∧  b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨  b^{15, 25}_0 ∨  p_375 ∨ break
c  in DIMACS:
-12587 -12588  12589  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 25}_2 ∧ -b^{15, 25}_1 ∧ -b^{15, 25}_0 ∧ true) 
c  in CNF:
c    -b^{15, 25}_2 ∨  b^{15, 25}_1 ∨  b^{15, 25}_0 ∨ false 
c  in DIMACS:
-12587  12588  12589  0

c  3 does not represent an automaton state.
c    -(-b^{15, 25}_2 ∧  b^{15, 25}_1 ∧  b^{15, 25}_0 ∧ true) 
c  in CNF:
c     b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ false 
c  in DIMACS:
 12587 -12588 -12589  0
c  -3 does not represent an automaton state.
c    -( b^{15, 25}_2 ∧  b^{15, 25}_1 ∧  b^{15, 25}_0 ∧ true) 
c  in CNF:
c    -b^{15, 25}_2 ∨ -b^{15, 25}_1 ∨ -b^{15, 25}_0 ∨ false 
c  in DIMACS:
-12587 -12588 -12589  0

c i = 26
c  -2+1 --> -1
c    ( b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧  p_390) -> ( b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0)
c  in CNF:
c    -b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨  b^{15, 27}_2
c    -b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_1
c    -b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨  b^{15, 27}_0
c  in DIMACS:
-12590 -12591  12592 -390  12593 0
-12590 -12591  12592 -390 -12594 0
-12590 -12591  12592 -390  12595 0

c  -1+1 --> 0
c    ( b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0 ∧  p_390) -> (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧ -b^{15, 27}_0)
c  in CNF:
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_2
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_1
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_0
c  in DIMACS:
-12590  12591 -12592 -390 -12593 0
-12590  12591 -12592 -390 -12594 0
-12590  12591 -12592 -390 -12595 0

c  0+1 --> 1
c    (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧  p_390) -> (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0)
c  in CNF:
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_2
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_1
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨  b^{15, 27}_0
c  in DIMACS:
 12590  12591  12592 -390 -12593 0
 12590  12591  12592 -390 -12594 0
 12590  12591  12592 -390  12595 0

c  1+1 --> 2
c    (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0 ∧  p_390) -> (-b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0)
c  in CNF:
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_2
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨  b^{15, 27}_1
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ -p_390 ∨ -b^{15, 27}_0
c  in DIMACS:
 12590  12591 -12592 -390 -12593 0
 12590  12591 -12592 -390  12594 0
 12590  12591 -12592 -390 -12595 0

c  2+1 --> break 
c    (-b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧  p_390) -> break
c  in CNF:
c     b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 12590 -12591  12592 -390 1162 0


c  2-1 --> 1
c    (-b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧ -p_390) -> (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0)
c  in CNF:
c     b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_2
c     b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_1
c     b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨  b^{15, 27}_0
c  in DIMACS:
 12590 -12591  12592  390 -12593 0
 12590 -12591  12592  390 -12594 0
 12590 -12591  12592  390  12595 0

c  1-1 --> 0
c    (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0 ∧ -p_390) -> (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧ -b^{15, 27}_0)
c  in CNF:
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_2
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_1
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_0
c  in DIMACS:
 12590  12591 -12592  390 -12593 0
 12590  12591 -12592  390 -12594 0
 12590  12591 -12592  390 -12595 0

c  0-1 --> -1
c    (-b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧ -p_390) -> ( b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0)
c  in CNF:
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨  b^{15, 27}_2
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_1
c     b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨  b^{15, 27}_0
c  in DIMACS:
 12590  12591  12592  390  12593 0
 12590  12591  12592  390 -12594 0
 12590  12591  12592  390  12595 0

c  -1-1 --> -2
c    ( b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧  b^{15, 26}_0 ∧ -p_390) -> ( b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0)
c  in CNF:
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨  b^{15, 27}_2
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨  b^{15, 27}_1
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨  p_390 ∨ -b^{15, 27}_0
c  in DIMACS:
-12590  12591 -12592  390  12593 0
-12590  12591 -12592  390  12594 0
-12590  12591 -12592  390 -12595 0

c  -2-1 --> break 
c    ( b^{15, 26}_2 ∧  b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨  b^{15, 26}_0 ∨  p_390 ∨ break
c  in DIMACS:
-12590 -12591  12592  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 26}_2 ∧ -b^{15, 26}_1 ∧ -b^{15, 26}_0 ∧ true) 
c  in CNF:
c    -b^{15, 26}_2 ∨  b^{15, 26}_1 ∨  b^{15, 26}_0 ∨ false 
c  in DIMACS:
-12590  12591  12592  0

c  3 does not represent an automaton state.
c    -(-b^{15, 26}_2 ∧  b^{15, 26}_1 ∧  b^{15, 26}_0 ∧ true) 
c  in CNF:
c     b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ false 
c  in DIMACS:
 12590 -12591 -12592  0
c  -3 does not represent an automaton state.
c    -( b^{15, 26}_2 ∧  b^{15, 26}_1 ∧  b^{15, 26}_0 ∧ true) 
c  in CNF:
c    -b^{15, 26}_2 ∨ -b^{15, 26}_1 ∨ -b^{15, 26}_0 ∨ false 
c  in DIMACS:
-12590 -12591 -12592  0

c i = 27
c  -2+1 --> -1
c    ( b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧  p_405) -> ( b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0)
c  in CNF:
c    -b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨  b^{15, 28}_2
c    -b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_1
c    -b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨  b^{15, 28}_0
c  in DIMACS:
-12593 -12594  12595 -405  12596 0
-12593 -12594  12595 -405 -12597 0
-12593 -12594  12595 -405  12598 0

c  -1+1 --> 0
c    ( b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0 ∧  p_405) -> (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧ -b^{15, 28}_0)
c  in CNF:
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_2
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_1
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_0
c  in DIMACS:
-12593  12594 -12595 -405 -12596 0
-12593  12594 -12595 -405 -12597 0
-12593  12594 -12595 -405 -12598 0

c  0+1 --> 1
c    (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧  p_405) -> (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0)
c  in CNF:
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_2
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_1
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨  b^{15, 28}_0
c  in DIMACS:
 12593  12594  12595 -405 -12596 0
 12593  12594  12595 -405 -12597 0
 12593  12594  12595 -405  12598 0

c  1+1 --> 2
c    (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0 ∧  p_405) -> (-b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0)
c  in CNF:
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_2
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨  b^{15, 28}_1
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ -p_405 ∨ -b^{15, 28}_0
c  in DIMACS:
 12593  12594 -12595 -405 -12596 0
 12593  12594 -12595 -405  12597 0
 12593  12594 -12595 -405 -12598 0

c  2+1 --> break 
c    (-b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧  p_405) -> break
c  in CNF:
c     b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 12593 -12594  12595 -405 1162 0


c  2-1 --> 1
c    (-b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧ -p_405) -> (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0)
c  in CNF:
c     b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_2
c     b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_1
c     b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨  b^{15, 28}_0
c  in DIMACS:
 12593 -12594  12595  405 -12596 0
 12593 -12594  12595  405 -12597 0
 12593 -12594  12595  405  12598 0

c  1-1 --> 0
c    (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0 ∧ -p_405) -> (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧ -b^{15, 28}_0)
c  in CNF:
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_2
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_1
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_0
c  in DIMACS:
 12593  12594 -12595  405 -12596 0
 12593  12594 -12595  405 -12597 0
 12593  12594 -12595  405 -12598 0

c  0-1 --> -1
c    (-b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧ -p_405) -> ( b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0)
c  in CNF:
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨  b^{15, 28}_2
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_1
c     b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨  b^{15, 28}_0
c  in DIMACS:
 12593  12594  12595  405  12596 0
 12593  12594  12595  405 -12597 0
 12593  12594  12595  405  12598 0

c  -1-1 --> -2
c    ( b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧  b^{15, 27}_0 ∧ -p_405) -> ( b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0)
c  in CNF:
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨  b^{15, 28}_2
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨  b^{15, 28}_1
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨  p_405 ∨ -b^{15, 28}_0
c  in DIMACS:
-12593  12594 -12595  405  12596 0
-12593  12594 -12595  405  12597 0
-12593  12594 -12595  405 -12598 0

c  -2-1 --> break 
c    ( b^{15, 27}_2 ∧  b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨  b^{15, 27}_0 ∨  p_405 ∨ break
c  in DIMACS:
-12593 -12594  12595  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 27}_2 ∧ -b^{15, 27}_1 ∧ -b^{15, 27}_0 ∧ true) 
c  in CNF:
c    -b^{15, 27}_2 ∨  b^{15, 27}_1 ∨  b^{15, 27}_0 ∨ false 
c  in DIMACS:
-12593  12594  12595  0

c  3 does not represent an automaton state.
c    -(-b^{15, 27}_2 ∧  b^{15, 27}_1 ∧  b^{15, 27}_0 ∧ true) 
c  in CNF:
c     b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ false 
c  in DIMACS:
 12593 -12594 -12595  0
c  -3 does not represent an automaton state.
c    -( b^{15, 27}_2 ∧  b^{15, 27}_1 ∧  b^{15, 27}_0 ∧ true) 
c  in CNF:
c    -b^{15, 27}_2 ∨ -b^{15, 27}_1 ∨ -b^{15, 27}_0 ∨ false 
c  in DIMACS:
-12593 -12594 -12595  0

c i = 28
c  -2+1 --> -1
c    ( b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧  p_420) -> ( b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0)
c  in CNF:
c    -b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨  b^{15, 29}_2
c    -b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_1
c    -b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨  b^{15, 29}_0
c  in DIMACS:
-12596 -12597  12598 -420  12599 0
-12596 -12597  12598 -420 -12600 0
-12596 -12597  12598 -420  12601 0

c  -1+1 --> 0
c    ( b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0 ∧  p_420) -> (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧ -b^{15, 29}_0)
c  in CNF:
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_2
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_1
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_0
c  in DIMACS:
-12596  12597 -12598 -420 -12599 0
-12596  12597 -12598 -420 -12600 0
-12596  12597 -12598 -420 -12601 0

c  0+1 --> 1
c    (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧  p_420) -> (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0)
c  in CNF:
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_2
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_1
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨  b^{15, 29}_0
c  in DIMACS:
 12596  12597  12598 -420 -12599 0
 12596  12597  12598 -420 -12600 0
 12596  12597  12598 -420  12601 0

c  1+1 --> 2
c    (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0 ∧  p_420) -> (-b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0)
c  in CNF:
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_2
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨  b^{15, 29}_1
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ -p_420 ∨ -b^{15, 29}_0
c  in DIMACS:
 12596  12597 -12598 -420 -12599 0
 12596  12597 -12598 -420  12600 0
 12596  12597 -12598 -420 -12601 0

c  2+1 --> break 
c    (-b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧  p_420) -> break
c  in CNF:
c     b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 12596 -12597  12598 -420 1162 0


c  2-1 --> 1
c    (-b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧ -p_420) -> (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0)
c  in CNF:
c     b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_2
c     b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_1
c     b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨  b^{15, 29}_0
c  in DIMACS:
 12596 -12597  12598  420 -12599 0
 12596 -12597  12598  420 -12600 0
 12596 -12597  12598  420  12601 0

c  1-1 --> 0
c    (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0 ∧ -p_420) -> (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧ -b^{15, 29}_0)
c  in CNF:
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_2
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_1
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_0
c  in DIMACS:
 12596  12597 -12598  420 -12599 0
 12596  12597 -12598  420 -12600 0
 12596  12597 -12598  420 -12601 0

c  0-1 --> -1
c    (-b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧ -p_420) -> ( b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0)
c  in CNF:
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨  b^{15, 29}_2
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_1
c     b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨  b^{15, 29}_0
c  in DIMACS:
 12596  12597  12598  420  12599 0
 12596  12597  12598  420 -12600 0
 12596  12597  12598  420  12601 0

c  -1-1 --> -2
c    ( b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧  b^{15, 28}_0 ∧ -p_420) -> ( b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0)
c  in CNF:
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨  b^{15, 29}_2
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨  b^{15, 29}_1
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨  p_420 ∨ -b^{15, 29}_0
c  in DIMACS:
-12596  12597 -12598  420  12599 0
-12596  12597 -12598  420  12600 0
-12596  12597 -12598  420 -12601 0

c  -2-1 --> break 
c    ( b^{15, 28}_2 ∧  b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨  b^{15, 28}_0 ∨  p_420 ∨ break
c  in DIMACS:
-12596 -12597  12598  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 28}_2 ∧ -b^{15, 28}_1 ∧ -b^{15, 28}_0 ∧ true) 
c  in CNF:
c    -b^{15, 28}_2 ∨  b^{15, 28}_1 ∨  b^{15, 28}_0 ∨ false 
c  in DIMACS:
-12596  12597  12598  0

c  3 does not represent an automaton state.
c    -(-b^{15, 28}_2 ∧  b^{15, 28}_1 ∧  b^{15, 28}_0 ∧ true) 
c  in CNF:
c     b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ false 
c  in DIMACS:
 12596 -12597 -12598  0
c  -3 does not represent an automaton state.
c    -( b^{15, 28}_2 ∧  b^{15, 28}_1 ∧  b^{15, 28}_0 ∧ true) 
c  in CNF:
c    -b^{15, 28}_2 ∨ -b^{15, 28}_1 ∨ -b^{15, 28}_0 ∨ false 
c  in DIMACS:
-12596 -12597 -12598  0

c i = 29
c  -2+1 --> -1
c    ( b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧  p_435) -> ( b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0)
c  in CNF:
c    -b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨  b^{15, 30}_2
c    -b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_1
c    -b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨  b^{15, 30}_0
c  in DIMACS:
-12599 -12600  12601 -435  12602 0
-12599 -12600  12601 -435 -12603 0
-12599 -12600  12601 -435  12604 0

c  -1+1 --> 0
c    ( b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0 ∧  p_435) -> (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧ -b^{15, 30}_0)
c  in CNF:
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_2
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_1
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_0
c  in DIMACS:
-12599  12600 -12601 -435 -12602 0
-12599  12600 -12601 -435 -12603 0
-12599  12600 -12601 -435 -12604 0

c  0+1 --> 1
c    (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧  p_435) -> (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0)
c  in CNF:
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_2
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_1
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨  b^{15, 30}_0
c  in DIMACS:
 12599  12600  12601 -435 -12602 0
 12599  12600  12601 -435 -12603 0
 12599  12600  12601 -435  12604 0

c  1+1 --> 2
c    (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0 ∧  p_435) -> (-b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0)
c  in CNF:
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_2
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨  b^{15, 30}_1
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ -p_435 ∨ -b^{15, 30}_0
c  in DIMACS:
 12599  12600 -12601 -435 -12602 0
 12599  12600 -12601 -435  12603 0
 12599  12600 -12601 -435 -12604 0

c  2+1 --> break 
c    (-b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧  p_435) -> break
c  in CNF:
c     b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 12599 -12600  12601 -435 1162 0


c  2-1 --> 1
c    (-b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧ -p_435) -> (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0)
c  in CNF:
c     b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_2
c     b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_1
c     b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨  b^{15, 30}_0
c  in DIMACS:
 12599 -12600  12601  435 -12602 0
 12599 -12600  12601  435 -12603 0
 12599 -12600  12601  435  12604 0

c  1-1 --> 0
c    (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0 ∧ -p_435) -> (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧ -b^{15, 30}_0)
c  in CNF:
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_2
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_1
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_0
c  in DIMACS:
 12599  12600 -12601  435 -12602 0
 12599  12600 -12601  435 -12603 0
 12599  12600 -12601  435 -12604 0

c  0-1 --> -1
c    (-b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧ -p_435) -> ( b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0)
c  in CNF:
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨  b^{15, 30}_2
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_1
c     b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨  b^{15, 30}_0
c  in DIMACS:
 12599  12600  12601  435  12602 0
 12599  12600  12601  435 -12603 0
 12599  12600  12601  435  12604 0

c  -1-1 --> -2
c    ( b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧  b^{15, 29}_0 ∧ -p_435) -> ( b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0)
c  in CNF:
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨  b^{15, 30}_2
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨  b^{15, 30}_1
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨  p_435 ∨ -b^{15, 30}_0
c  in DIMACS:
-12599  12600 -12601  435  12602 0
-12599  12600 -12601  435  12603 0
-12599  12600 -12601  435 -12604 0

c  -2-1 --> break 
c    ( b^{15, 29}_2 ∧  b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨  b^{15, 29}_0 ∨  p_435 ∨ break
c  in DIMACS:
-12599 -12600  12601  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 29}_2 ∧ -b^{15, 29}_1 ∧ -b^{15, 29}_0 ∧ true) 
c  in CNF:
c    -b^{15, 29}_2 ∨  b^{15, 29}_1 ∨  b^{15, 29}_0 ∨ false 
c  in DIMACS:
-12599  12600  12601  0

c  3 does not represent an automaton state.
c    -(-b^{15, 29}_2 ∧  b^{15, 29}_1 ∧  b^{15, 29}_0 ∧ true) 
c  in CNF:
c     b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ false 
c  in DIMACS:
 12599 -12600 -12601  0
c  -3 does not represent an automaton state.
c    -( b^{15, 29}_2 ∧  b^{15, 29}_1 ∧  b^{15, 29}_0 ∧ true) 
c  in CNF:
c    -b^{15, 29}_2 ∨ -b^{15, 29}_1 ∨ -b^{15, 29}_0 ∨ false 
c  in DIMACS:
-12599 -12600 -12601  0

c i = 30
c  -2+1 --> -1
c    ( b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧  p_450) -> ( b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0)
c  in CNF:
c    -b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨  b^{15, 31}_2
c    -b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_1
c    -b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨  b^{15, 31}_0
c  in DIMACS:
-12602 -12603  12604 -450  12605 0
-12602 -12603  12604 -450 -12606 0
-12602 -12603  12604 -450  12607 0

c  -1+1 --> 0
c    ( b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0 ∧  p_450) -> (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧ -b^{15, 31}_0)
c  in CNF:
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_2
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_1
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_0
c  in DIMACS:
-12602  12603 -12604 -450 -12605 0
-12602  12603 -12604 -450 -12606 0
-12602  12603 -12604 -450 -12607 0

c  0+1 --> 1
c    (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧  p_450) -> (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0)
c  in CNF:
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_2
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_1
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨  b^{15, 31}_0
c  in DIMACS:
 12602  12603  12604 -450 -12605 0
 12602  12603  12604 -450 -12606 0
 12602  12603  12604 -450  12607 0

c  1+1 --> 2
c    (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0 ∧  p_450) -> (-b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0)
c  in CNF:
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_2
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨  b^{15, 31}_1
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ -p_450 ∨ -b^{15, 31}_0
c  in DIMACS:
 12602  12603 -12604 -450 -12605 0
 12602  12603 -12604 -450  12606 0
 12602  12603 -12604 -450 -12607 0

c  2+1 --> break 
c    (-b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧  p_450) -> break
c  in CNF:
c     b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 12602 -12603  12604 -450 1162 0


c  2-1 --> 1
c    (-b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧ -p_450) -> (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0)
c  in CNF:
c     b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_2
c     b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_1
c     b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨  b^{15, 31}_0
c  in DIMACS:
 12602 -12603  12604  450 -12605 0
 12602 -12603  12604  450 -12606 0
 12602 -12603  12604  450  12607 0

c  1-1 --> 0
c    (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0 ∧ -p_450) -> (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧ -b^{15, 31}_0)
c  in CNF:
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_2
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_1
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_0
c  in DIMACS:
 12602  12603 -12604  450 -12605 0
 12602  12603 -12604  450 -12606 0
 12602  12603 -12604  450 -12607 0

c  0-1 --> -1
c    (-b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧ -p_450) -> ( b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0)
c  in CNF:
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨  b^{15, 31}_2
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_1
c     b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨  b^{15, 31}_0
c  in DIMACS:
 12602  12603  12604  450  12605 0
 12602  12603  12604  450 -12606 0
 12602  12603  12604  450  12607 0

c  -1-1 --> -2
c    ( b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧  b^{15, 30}_0 ∧ -p_450) -> ( b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0)
c  in CNF:
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨  b^{15, 31}_2
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨  b^{15, 31}_1
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨  p_450 ∨ -b^{15, 31}_0
c  in DIMACS:
-12602  12603 -12604  450  12605 0
-12602  12603 -12604  450  12606 0
-12602  12603 -12604  450 -12607 0

c  -2-1 --> break 
c    ( b^{15, 30}_2 ∧  b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨  b^{15, 30}_0 ∨  p_450 ∨ break
c  in DIMACS:
-12602 -12603  12604  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 30}_2 ∧ -b^{15, 30}_1 ∧ -b^{15, 30}_0 ∧ true) 
c  in CNF:
c    -b^{15, 30}_2 ∨  b^{15, 30}_1 ∨  b^{15, 30}_0 ∨ false 
c  in DIMACS:
-12602  12603  12604  0

c  3 does not represent an automaton state.
c    -(-b^{15, 30}_2 ∧  b^{15, 30}_1 ∧  b^{15, 30}_0 ∧ true) 
c  in CNF:
c     b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ false 
c  in DIMACS:
 12602 -12603 -12604  0
c  -3 does not represent an automaton state.
c    -( b^{15, 30}_2 ∧  b^{15, 30}_1 ∧  b^{15, 30}_0 ∧ true) 
c  in CNF:
c    -b^{15, 30}_2 ∨ -b^{15, 30}_1 ∨ -b^{15, 30}_0 ∨ false 
c  in DIMACS:
-12602 -12603 -12604  0

c i = 31
c  -2+1 --> -1
c    ( b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧  p_465) -> ( b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0)
c  in CNF:
c    -b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨  b^{15, 32}_2
c    -b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_1
c    -b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨  b^{15, 32}_0
c  in DIMACS:
-12605 -12606  12607 -465  12608 0
-12605 -12606  12607 -465 -12609 0
-12605 -12606  12607 -465  12610 0

c  -1+1 --> 0
c    ( b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0 ∧  p_465) -> (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧ -b^{15, 32}_0)
c  in CNF:
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_2
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_1
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_0
c  in DIMACS:
-12605  12606 -12607 -465 -12608 0
-12605  12606 -12607 -465 -12609 0
-12605  12606 -12607 -465 -12610 0

c  0+1 --> 1
c    (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧  p_465) -> (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0)
c  in CNF:
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_2
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_1
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨  b^{15, 32}_0
c  in DIMACS:
 12605  12606  12607 -465 -12608 0
 12605  12606  12607 -465 -12609 0
 12605  12606  12607 -465  12610 0

c  1+1 --> 2
c    (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0 ∧  p_465) -> (-b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0)
c  in CNF:
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_2
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨  b^{15, 32}_1
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ -p_465 ∨ -b^{15, 32}_0
c  in DIMACS:
 12605  12606 -12607 -465 -12608 0
 12605  12606 -12607 -465  12609 0
 12605  12606 -12607 -465 -12610 0

c  2+1 --> break 
c    (-b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧  p_465) -> break
c  in CNF:
c     b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 12605 -12606  12607 -465 1162 0


c  2-1 --> 1
c    (-b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧ -p_465) -> (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0)
c  in CNF:
c     b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_2
c     b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_1
c     b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨  b^{15, 32}_0
c  in DIMACS:
 12605 -12606  12607  465 -12608 0
 12605 -12606  12607  465 -12609 0
 12605 -12606  12607  465  12610 0

c  1-1 --> 0
c    (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0 ∧ -p_465) -> (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧ -b^{15, 32}_0)
c  in CNF:
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_2
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_1
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_0
c  in DIMACS:
 12605  12606 -12607  465 -12608 0
 12605  12606 -12607  465 -12609 0
 12605  12606 -12607  465 -12610 0

c  0-1 --> -1
c    (-b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧ -p_465) -> ( b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0)
c  in CNF:
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨  b^{15, 32}_2
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_1
c     b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨  b^{15, 32}_0
c  in DIMACS:
 12605  12606  12607  465  12608 0
 12605  12606  12607  465 -12609 0
 12605  12606  12607  465  12610 0

c  -1-1 --> -2
c    ( b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧  b^{15, 31}_0 ∧ -p_465) -> ( b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0)
c  in CNF:
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨  b^{15, 32}_2
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨  b^{15, 32}_1
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨  p_465 ∨ -b^{15, 32}_0
c  in DIMACS:
-12605  12606 -12607  465  12608 0
-12605  12606 -12607  465  12609 0
-12605  12606 -12607  465 -12610 0

c  -2-1 --> break 
c    ( b^{15, 31}_2 ∧  b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨  b^{15, 31}_0 ∨  p_465 ∨ break
c  in DIMACS:
-12605 -12606  12607  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 31}_2 ∧ -b^{15, 31}_1 ∧ -b^{15, 31}_0 ∧ true) 
c  in CNF:
c    -b^{15, 31}_2 ∨  b^{15, 31}_1 ∨  b^{15, 31}_0 ∨ false 
c  in DIMACS:
-12605  12606  12607  0

c  3 does not represent an automaton state.
c    -(-b^{15, 31}_2 ∧  b^{15, 31}_1 ∧  b^{15, 31}_0 ∧ true) 
c  in CNF:
c     b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ false 
c  in DIMACS:
 12605 -12606 -12607  0
c  -3 does not represent an automaton state.
c    -( b^{15, 31}_2 ∧  b^{15, 31}_1 ∧  b^{15, 31}_0 ∧ true) 
c  in CNF:
c    -b^{15, 31}_2 ∨ -b^{15, 31}_1 ∨ -b^{15, 31}_0 ∨ false 
c  in DIMACS:
-12605 -12606 -12607  0

c i = 32
c  -2+1 --> -1
c    ( b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧  p_480) -> ( b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0)
c  in CNF:
c    -b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨  b^{15, 33}_2
c    -b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_1
c    -b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨  b^{15, 33}_0
c  in DIMACS:
-12608 -12609  12610 -480  12611 0
-12608 -12609  12610 -480 -12612 0
-12608 -12609  12610 -480  12613 0

c  -1+1 --> 0
c    ( b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0 ∧  p_480) -> (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧ -b^{15, 33}_0)
c  in CNF:
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_2
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_1
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_0
c  in DIMACS:
-12608  12609 -12610 -480 -12611 0
-12608  12609 -12610 -480 -12612 0
-12608  12609 -12610 -480 -12613 0

c  0+1 --> 1
c    (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧  p_480) -> (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0)
c  in CNF:
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_2
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_1
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨  b^{15, 33}_0
c  in DIMACS:
 12608  12609  12610 -480 -12611 0
 12608  12609  12610 -480 -12612 0
 12608  12609  12610 -480  12613 0

c  1+1 --> 2
c    (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0 ∧  p_480) -> (-b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0)
c  in CNF:
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_2
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨  b^{15, 33}_1
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ -p_480 ∨ -b^{15, 33}_0
c  in DIMACS:
 12608  12609 -12610 -480 -12611 0
 12608  12609 -12610 -480  12612 0
 12608  12609 -12610 -480 -12613 0

c  2+1 --> break 
c    (-b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧  p_480) -> break
c  in CNF:
c     b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 12608 -12609  12610 -480 1162 0


c  2-1 --> 1
c    (-b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧ -p_480) -> (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0)
c  in CNF:
c     b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_2
c     b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_1
c     b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨  b^{15, 33}_0
c  in DIMACS:
 12608 -12609  12610  480 -12611 0
 12608 -12609  12610  480 -12612 0
 12608 -12609  12610  480  12613 0

c  1-1 --> 0
c    (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0 ∧ -p_480) -> (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧ -b^{15, 33}_0)
c  in CNF:
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_2
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_1
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_0
c  in DIMACS:
 12608  12609 -12610  480 -12611 0
 12608  12609 -12610  480 -12612 0
 12608  12609 -12610  480 -12613 0

c  0-1 --> -1
c    (-b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧ -p_480) -> ( b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0)
c  in CNF:
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨  b^{15, 33}_2
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_1
c     b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨  b^{15, 33}_0
c  in DIMACS:
 12608  12609  12610  480  12611 0
 12608  12609  12610  480 -12612 0
 12608  12609  12610  480  12613 0

c  -1-1 --> -2
c    ( b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧  b^{15, 32}_0 ∧ -p_480) -> ( b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0)
c  in CNF:
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨  b^{15, 33}_2
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨  b^{15, 33}_1
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨  p_480 ∨ -b^{15, 33}_0
c  in DIMACS:
-12608  12609 -12610  480  12611 0
-12608  12609 -12610  480  12612 0
-12608  12609 -12610  480 -12613 0

c  -2-1 --> break 
c    ( b^{15, 32}_2 ∧  b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨  b^{15, 32}_0 ∨  p_480 ∨ break
c  in DIMACS:
-12608 -12609  12610  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 32}_2 ∧ -b^{15, 32}_1 ∧ -b^{15, 32}_0 ∧ true) 
c  in CNF:
c    -b^{15, 32}_2 ∨  b^{15, 32}_1 ∨  b^{15, 32}_0 ∨ false 
c  in DIMACS:
-12608  12609  12610  0

c  3 does not represent an automaton state.
c    -(-b^{15, 32}_2 ∧  b^{15, 32}_1 ∧  b^{15, 32}_0 ∧ true) 
c  in CNF:
c     b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ false 
c  in DIMACS:
 12608 -12609 -12610  0
c  -3 does not represent an automaton state.
c    -( b^{15, 32}_2 ∧  b^{15, 32}_1 ∧  b^{15, 32}_0 ∧ true) 
c  in CNF:
c    -b^{15, 32}_2 ∨ -b^{15, 32}_1 ∨ -b^{15, 32}_0 ∨ false 
c  in DIMACS:
-12608 -12609 -12610  0

c i = 33
c  -2+1 --> -1
c    ( b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧  p_495) -> ( b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0)
c  in CNF:
c    -b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨  b^{15, 34}_2
c    -b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_1
c    -b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨  b^{15, 34}_0
c  in DIMACS:
-12611 -12612  12613 -495  12614 0
-12611 -12612  12613 -495 -12615 0
-12611 -12612  12613 -495  12616 0

c  -1+1 --> 0
c    ( b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0 ∧  p_495) -> (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧ -b^{15, 34}_0)
c  in CNF:
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_2
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_1
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_0
c  in DIMACS:
-12611  12612 -12613 -495 -12614 0
-12611  12612 -12613 -495 -12615 0
-12611  12612 -12613 -495 -12616 0

c  0+1 --> 1
c    (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧  p_495) -> (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0)
c  in CNF:
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_2
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_1
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨  b^{15, 34}_0
c  in DIMACS:
 12611  12612  12613 -495 -12614 0
 12611  12612  12613 -495 -12615 0
 12611  12612  12613 -495  12616 0

c  1+1 --> 2
c    (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0 ∧  p_495) -> (-b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0)
c  in CNF:
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_2
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨  b^{15, 34}_1
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ -p_495 ∨ -b^{15, 34}_0
c  in DIMACS:
 12611  12612 -12613 -495 -12614 0
 12611  12612 -12613 -495  12615 0
 12611  12612 -12613 -495 -12616 0

c  2+1 --> break 
c    (-b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧  p_495) -> break
c  in CNF:
c     b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 12611 -12612  12613 -495 1162 0


c  2-1 --> 1
c    (-b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧ -p_495) -> (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0)
c  in CNF:
c     b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_2
c     b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_1
c     b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨  b^{15, 34}_0
c  in DIMACS:
 12611 -12612  12613  495 -12614 0
 12611 -12612  12613  495 -12615 0
 12611 -12612  12613  495  12616 0

c  1-1 --> 0
c    (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0 ∧ -p_495) -> (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧ -b^{15, 34}_0)
c  in CNF:
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_2
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_1
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_0
c  in DIMACS:
 12611  12612 -12613  495 -12614 0
 12611  12612 -12613  495 -12615 0
 12611  12612 -12613  495 -12616 0

c  0-1 --> -1
c    (-b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧ -p_495) -> ( b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0)
c  in CNF:
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨  b^{15, 34}_2
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_1
c     b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨  b^{15, 34}_0
c  in DIMACS:
 12611  12612  12613  495  12614 0
 12611  12612  12613  495 -12615 0
 12611  12612  12613  495  12616 0

c  -1-1 --> -2
c    ( b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧  b^{15, 33}_0 ∧ -p_495) -> ( b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0)
c  in CNF:
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨  b^{15, 34}_2
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨  b^{15, 34}_1
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨  p_495 ∨ -b^{15, 34}_0
c  in DIMACS:
-12611  12612 -12613  495  12614 0
-12611  12612 -12613  495  12615 0
-12611  12612 -12613  495 -12616 0

c  -2-1 --> break 
c    ( b^{15, 33}_2 ∧  b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨  b^{15, 33}_0 ∨  p_495 ∨ break
c  in DIMACS:
-12611 -12612  12613  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 33}_2 ∧ -b^{15, 33}_1 ∧ -b^{15, 33}_0 ∧ true) 
c  in CNF:
c    -b^{15, 33}_2 ∨  b^{15, 33}_1 ∨  b^{15, 33}_0 ∨ false 
c  in DIMACS:
-12611  12612  12613  0

c  3 does not represent an automaton state.
c    -(-b^{15, 33}_2 ∧  b^{15, 33}_1 ∧  b^{15, 33}_0 ∧ true) 
c  in CNF:
c     b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ false 
c  in DIMACS:
 12611 -12612 -12613  0
c  -3 does not represent an automaton state.
c    -( b^{15, 33}_2 ∧  b^{15, 33}_1 ∧  b^{15, 33}_0 ∧ true) 
c  in CNF:
c    -b^{15, 33}_2 ∨ -b^{15, 33}_1 ∨ -b^{15, 33}_0 ∨ false 
c  in DIMACS:
-12611 -12612 -12613  0

c i = 34
c  -2+1 --> -1
c    ( b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧  p_510) -> ( b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0)
c  in CNF:
c    -b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨  b^{15, 35}_2
c    -b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_1
c    -b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨  b^{15, 35}_0
c  in DIMACS:
-12614 -12615  12616 -510  12617 0
-12614 -12615  12616 -510 -12618 0
-12614 -12615  12616 -510  12619 0

c  -1+1 --> 0
c    ( b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0 ∧  p_510) -> (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧ -b^{15, 35}_0)
c  in CNF:
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_2
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_1
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_0
c  in DIMACS:
-12614  12615 -12616 -510 -12617 0
-12614  12615 -12616 -510 -12618 0
-12614  12615 -12616 -510 -12619 0

c  0+1 --> 1
c    (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧  p_510) -> (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0)
c  in CNF:
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_2
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_1
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨  b^{15, 35}_0
c  in DIMACS:
 12614  12615  12616 -510 -12617 0
 12614  12615  12616 -510 -12618 0
 12614  12615  12616 -510  12619 0

c  1+1 --> 2
c    (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0 ∧  p_510) -> (-b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0)
c  in CNF:
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_2
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨  b^{15, 35}_1
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ -p_510 ∨ -b^{15, 35}_0
c  in DIMACS:
 12614  12615 -12616 -510 -12617 0
 12614  12615 -12616 -510  12618 0
 12614  12615 -12616 -510 -12619 0

c  2+1 --> break 
c    (-b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧  p_510) -> break
c  in CNF:
c     b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 12614 -12615  12616 -510 1162 0


c  2-1 --> 1
c    (-b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧ -p_510) -> (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0)
c  in CNF:
c     b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_2
c     b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_1
c     b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨  b^{15, 35}_0
c  in DIMACS:
 12614 -12615  12616  510 -12617 0
 12614 -12615  12616  510 -12618 0
 12614 -12615  12616  510  12619 0

c  1-1 --> 0
c    (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0 ∧ -p_510) -> (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧ -b^{15, 35}_0)
c  in CNF:
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_2
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_1
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_0
c  in DIMACS:
 12614  12615 -12616  510 -12617 0
 12614  12615 -12616  510 -12618 0
 12614  12615 -12616  510 -12619 0

c  0-1 --> -1
c    (-b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧ -p_510) -> ( b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0)
c  in CNF:
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨  b^{15, 35}_2
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_1
c     b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨  b^{15, 35}_0
c  in DIMACS:
 12614  12615  12616  510  12617 0
 12614  12615  12616  510 -12618 0
 12614  12615  12616  510  12619 0

c  -1-1 --> -2
c    ( b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧  b^{15, 34}_0 ∧ -p_510) -> ( b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0)
c  in CNF:
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨  b^{15, 35}_2
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨  b^{15, 35}_1
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨  p_510 ∨ -b^{15, 35}_0
c  in DIMACS:
-12614  12615 -12616  510  12617 0
-12614  12615 -12616  510  12618 0
-12614  12615 -12616  510 -12619 0

c  -2-1 --> break 
c    ( b^{15, 34}_2 ∧  b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨  b^{15, 34}_0 ∨  p_510 ∨ break
c  in DIMACS:
-12614 -12615  12616  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 34}_2 ∧ -b^{15, 34}_1 ∧ -b^{15, 34}_0 ∧ true) 
c  in CNF:
c    -b^{15, 34}_2 ∨  b^{15, 34}_1 ∨  b^{15, 34}_0 ∨ false 
c  in DIMACS:
-12614  12615  12616  0

c  3 does not represent an automaton state.
c    -(-b^{15, 34}_2 ∧  b^{15, 34}_1 ∧  b^{15, 34}_0 ∧ true) 
c  in CNF:
c     b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ false 
c  in DIMACS:
 12614 -12615 -12616  0
c  -3 does not represent an automaton state.
c    -( b^{15, 34}_2 ∧  b^{15, 34}_1 ∧  b^{15, 34}_0 ∧ true) 
c  in CNF:
c    -b^{15, 34}_2 ∨ -b^{15, 34}_1 ∨ -b^{15, 34}_0 ∨ false 
c  in DIMACS:
-12614 -12615 -12616  0

c i = 35
c  -2+1 --> -1
c    ( b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧  p_525) -> ( b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0)
c  in CNF:
c    -b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨  b^{15, 36}_2
c    -b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_1
c    -b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨  b^{15, 36}_0
c  in DIMACS:
-12617 -12618  12619 -525  12620 0
-12617 -12618  12619 -525 -12621 0
-12617 -12618  12619 -525  12622 0

c  -1+1 --> 0
c    ( b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0 ∧  p_525) -> (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧ -b^{15, 36}_0)
c  in CNF:
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_2
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_1
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_0
c  in DIMACS:
-12617  12618 -12619 -525 -12620 0
-12617  12618 -12619 -525 -12621 0
-12617  12618 -12619 -525 -12622 0

c  0+1 --> 1
c    (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧  p_525) -> (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0)
c  in CNF:
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_2
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_1
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨  b^{15, 36}_0
c  in DIMACS:
 12617  12618  12619 -525 -12620 0
 12617  12618  12619 -525 -12621 0
 12617  12618  12619 -525  12622 0

c  1+1 --> 2
c    (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0 ∧  p_525) -> (-b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0)
c  in CNF:
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_2
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨  b^{15, 36}_1
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ -p_525 ∨ -b^{15, 36}_0
c  in DIMACS:
 12617  12618 -12619 -525 -12620 0
 12617  12618 -12619 -525  12621 0
 12617  12618 -12619 -525 -12622 0

c  2+1 --> break 
c    (-b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧  p_525) -> break
c  in CNF:
c     b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 12617 -12618  12619 -525 1162 0


c  2-1 --> 1
c    (-b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧ -p_525) -> (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0)
c  in CNF:
c     b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_2
c     b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_1
c     b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨  b^{15, 36}_0
c  in DIMACS:
 12617 -12618  12619  525 -12620 0
 12617 -12618  12619  525 -12621 0
 12617 -12618  12619  525  12622 0

c  1-1 --> 0
c    (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0 ∧ -p_525) -> (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧ -b^{15, 36}_0)
c  in CNF:
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_2
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_1
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_0
c  in DIMACS:
 12617  12618 -12619  525 -12620 0
 12617  12618 -12619  525 -12621 0
 12617  12618 -12619  525 -12622 0

c  0-1 --> -1
c    (-b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧ -p_525) -> ( b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0)
c  in CNF:
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨  b^{15, 36}_2
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_1
c     b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨  b^{15, 36}_0
c  in DIMACS:
 12617  12618  12619  525  12620 0
 12617  12618  12619  525 -12621 0
 12617  12618  12619  525  12622 0

c  -1-1 --> -2
c    ( b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧  b^{15, 35}_0 ∧ -p_525) -> ( b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0)
c  in CNF:
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨  b^{15, 36}_2
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨  b^{15, 36}_1
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨  p_525 ∨ -b^{15, 36}_0
c  in DIMACS:
-12617  12618 -12619  525  12620 0
-12617  12618 -12619  525  12621 0
-12617  12618 -12619  525 -12622 0

c  -2-1 --> break 
c    ( b^{15, 35}_2 ∧  b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨  b^{15, 35}_0 ∨  p_525 ∨ break
c  in DIMACS:
-12617 -12618  12619  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 35}_2 ∧ -b^{15, 35}_1 ∧ -b^{15, 35}_0 ∧ true) 
c  in CNF:
c    -b^{15, 35}_2 ∨  b^{15, 35}_1 ∨  b^{15, 35}_0 ∨ false 
c  in DIMACS:
-12617  12618  12619  0

c  3 does not represent an automaton state.
c    -(-b^{15, 35}_2 ∧  b^{15, 35}_1 ∧  b^{15, 35}_0 ∧ true) 
c  in CNF:
c     b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ false 
c  in DIMACS:
 12617 -12618 -12619  0
c  -3 does not represent an automaton state.
c    -( b^{15, 35}_2 ∧  b^{15, 35}_1 ∧  b^{15, 35}_0 ∧ true) 
c  in CNF:
c    -b^{15, 35}_2 ∨ -b^{15, 35}_1 ∨ -b^{15, 35}_0 ∨ false 
c  in DIMACS:
-12617 -12618 -12619  0

c i = 36
c  -2+1 --> -1
c    ( b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧  p_540) -> ( b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0)
c  in CNF:
c    -b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨  b^{15, 37}_2
c    -b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_1
c    -b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨  b^{15, 37}_0
c  in DIMACS:
-12620 -12621  12622 -540  12623 0
-12620 -12621  12622 -540 -12624 0
-12620 -12621  12622 -540  12625 0

c  -1+1 --> 0
c    ( b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0 ∧  p_540) -> (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧ -b^{15, 37}_0)
c  in CNF:
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_2
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_1
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_0
c  in DIMACS:
-12620  12621 -12622 -540 -12623 0
-12620  12621 -12622 -540 -12624 0
-12620  12621 -12622 -540 -12625 0

c  0+1 --> 1
c    (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧  p_540) -> (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0)
c  in CNF:
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_2
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_1
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨  b^{15, 37}_0
c  in DIMACS:
 12620  12621  12622 -540 -12623 0
 12620  12621  12622 -540 -12624 0
 12620  12621  12622 -540  12625 0

c  1+1 --> 2
c    (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0 ∧  p_540) -> (-b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0)
c  in CNF:
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_2
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨  b^{15, 37}_1
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ -p_540 ∨ -b^{15, 37}_0
c  in DIMACS:
 12620  12621 -12622 -540 -12623 0
 12620  12621 -12622 -540  12624 0
 12620  12621 -12622 -540 -12625 0

c  2+1 --> break 
c    (-b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧  p_540) -> break
c  in CNF:
c     b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 12620 -12621  12622 -540 1162 0


c  2-1 --> 1
c    (-b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧ -p_540) -> (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0)
c  in CNF:
c     b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_2
c     b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_1
c     b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨  b^{15, 37}_0
c  in DIMACS:
 12620 -12621  12622  540 -12623 0
 12620 -12621  12622  540 -12624 0
 12620 -12621  12622  540  12625 0

c  1-1 --> 0
c    (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0 ∧ -p_540) -> (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧ -b^{15, 37}_0)
c  in CNF:
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_2
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_1
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_0
c  in DIMACS:
 12620  12621 -12622  540 -12623 0
 12620  12621 -12622  540 -12624 0
 12620  12621 -12622  540 -12625 0

c  0-1 --> -1
c    (-b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧ -p_540) -> ( b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0)
c  in CNF:
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨  b^{15, 37}_2
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_1
c     b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨  b^{15, 37}_0
c  in DIMACS:
 12620  12621  12622  540  12623 0
 12620  12621  12622  540 -12624 0
 12620  12621  12622  540  12625 0

c  -1-1 --> -2
c    ( b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧  b^{15, 36}_0 ∧ -p_540) -> ( b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0)
c  in CNF:
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨  b^{15, 37}_2
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨  b^{15, 37}_1
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨  p_540 ∨ -b^{15, 37}_0
c  in DIMACS:
-12620  12621 -12622  540  12623 0
-12620  12621 -12622  540  12624 0
-12620  12621 -12622  540 -12625 0

c  -2-1 --> break 
c    ( b^{15, 36}_2 ∧  b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨  b^{15, 36}_0 ∨  p_540 ∨ break
c  in DIMACS:
-12620 -12621  12622  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 36}_2 ∧ -b^{15, 36}_1 ∧ -b^{15, 36}_0 ∧ true) 
c  in CNF:
c    -b^{15, 36}_2 ∨  b^{15, 36}_1 ∨  b^{15, 36}_0 ∨ false 
c  in DIMACS:
-12620  12621  12622  0

c  3 does not represent an automaton state.
c    -(-b^{15, 36}_2 ∧  b^{15, 36}_1 ∧  b^{15, 36}_0 ∧ true) 
c  in CNF:
c     b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ false 
c  in DIMACS:
 12620 -12621 -12622  0
c  -3 does not represent an automaton state.
c    -( b^{15, 36}_2 ∧  b^{15, 36}_1 ∧  b^{15, 36}_0 ∧ true) 
c  in CNF:
c    -b^{15, 36}_2 ∨ -b^{15, 36}_1 ∨ -b^{15, 36}_0 ∨ false 
c  in DIMACS:
-12620 -12621 -12622  0

c i = 37
c  -2+1 --> -1
c    ( b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧  p_555) -> ( b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0)
c  in CNF:
c    -b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨  b^{15, 38}_2
c    -b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_1
c    -b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨  b^{15, 38}_0
c  in DIMACS:
-12623 -12624  12625 -555  12626 0
-12623 -12624  12625 -555 -12627 0
-12623 -12624  12625 -555  12628 0

c  -1+1 --> 0
c    ( b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0 ∧  p_555) -> (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧ -b^{15, 38}_0)
c  in CNF:
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_2
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_1
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_0
c  in DIMACS:
-12623  12624 -12625 -555 -12626 0
-12623  12624 -12625 -555 -12627 0
-12623  12624 -12625 -555 -12628 0

c  0+1 --> 1
c    (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧  p_555) -> (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0)
c  in CNF:
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_2
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_1
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨  b^{15, 38}_0
c  in DIMACS:
 12623  12624  12625 -555 -12626 0
 12623  12624  12625 -555 -12627 0
 12623  12624  12625 -555  12628 0

c  1+1 --> 2
c    (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0 ∧  p_555) -> (-b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0)
c  in CNF:
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_2
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨  b^{15, 38}_1
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ -p_555 ∨ -b^{15, 38}_0
c  in DIMACS:
 12623  12624 -12625 -555 -12626 0
 12623  12624 -12625 -555  12627 0
 12623  12624 -12625 -555 -12628 0

c  2+1 --> break 
c    (-b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧  p_555) -> break
c  in CNF:
c     b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 12623 -12624  12625 -555 1162 0


c  2-1 --> 1
c    (-b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧ -p_555) -> (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0)
c  in CNF:
c     b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_2
c     b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_1
c     b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨  b^{15, 38}_0
c  in DIMACS:
 12623 -12624  12625  555 -12626 0
 12623 -12624  12625  555 -12627 0
 12623 -12624  12625  555  12628 0

c  1-1 --> 0
c    (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0 ∧ -p_555) -> (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧ -b^{15, 38}_0)
c  in CNF:
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_2
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_1
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_0
c  in DIMACS:
 12623  12624 -12625  555 -12626 0
 12623  12624 -12625  555 -12627 0
 12623  12624 -12625  555 -12628 0

c  0-1 --> -1
c    (-b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧ -p_555) -> ( b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0)
c  in CNF:
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨  b^{15, 38}_2
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_1
c     b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨  b^{15, 38}_0
c  in DIMACS:
 12623  12624  12625  555  12626 0
 12623  12624  12625  555 -12627 0
 12623  12624  12625  555  12628 0

c  -1-1 --> -2
c    ( b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧  b^{15, 37}_0 ∧ -p_555) -> ( b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0)
c  in CNF:
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨  b^{15, 38}_2
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨  b^{15, 38}_1
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨  p_555 ∨ -b^{15, 38}_0
c  in DIMACS:
-12623  12624 -12625  555  12626 0
-12623  12624 -12625  555  12627 0
-12623  12624 -12625  555 -12628 0

c  -2-1 --> break 
c    ( b^{15, 37}_2 ∧  b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨  b^{15, 37}_0 ∨  p_555 ∨ break
c  in DIMACS:
-12623 -12624  12625  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 37}_2 ∧ -b^{15, 37}_1 ∧ -b^{15, 37}_0 ∧ true) 
c  in CNF:
c    -b^{15, 37}_2 ∨  b^{15, 37}_1 ∨  b^{15, 37}_0 ∨ false 
c  in DIMACS:
-12623  12624  12625  0

c  3 does not represent an automaton state.
c    -(-b^{15, 37}_2 ∧  b^{15, 37}_1 ∧  b^{15, 37}_0 ∧ true) 
c  in CNF:
c     b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ false 
c  in DIMACS:
 12623 -12624 -12625  0
c  -3 does not represent an automaton state.
c    -( b^{15, 37}_2 ∧  b^{15, 37}_1 ∧  b^{15, 37}_0 ∧ true) 
c  in CNF:
c    -b^{15, 37}_2 ∨ -b^{15, 37}_1 ∨ -b^{15, 37}_0 ∨ false 
c  in DIMACS:
-12623 -12624 -12625  0

c i = 38
c  -2+1 --> -1
c    ( b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧  p_570) -> ( b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0)
c  in CNF:
c    -b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨  b^{15, 39}_2
c    -b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_1
c    -b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨  b^{15, 39}_0
c  in DIMACS:
-12626 -12627  12628 -570  12629 0
-12626 -12627  12628 -570 -12630 0
-12626 -12627  12628 -570  12631 0

c  -1+1 --> 0
c    ( b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0 ∧  p_570) -> (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧ -b^{15, 39}_0)
c  in CNF:
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_2
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_1
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_0
c  in DIMACS:
-12626  12627 -12628 -570 -12629 0
-12626  12627 -12628 -570 -12630 0
-12626  12627 -12628 -570 -12631 0

c  0+1 --> 1
c    (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧  p_570) -> (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0)
c  in CNF:
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_2
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_1
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨  b^{15, 39}_0
c  in DIMACS:
 12626  12627  12628 -570 -12629 0
 12626  12627  12628 -570 -12630 0
 12626  12627  12628 -570  12631 0

c  1+1 --> 2
c    (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0 ∧  p_570) -> (-b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0)
c  in CNF:
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_2
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨  b^{15, 39}_1
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ -p_570 ∨ -b^{15, 39}_0
c  in DIMACS:
 12626  12627 -12628 -570 -12629 0
 12626  12627 -12628 -570  12630 0
 12626  12627 -12628 -570 -12631 0

c  2+1 --> break 
c    (-b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧  p_570) -> break
c  in CNF:
c     b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 12626 -12627  12628 -570 1162 0


c  2-1 --> 1
c    (-b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧ -p_570) -> (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0)
c  in CNF:
c     b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_2
c     b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_1
c     b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨  b^{15, 39}_0
c  in DIMACS:
 12626 -12627  12628  570 -12629 0
 12626 -12627  12628  570 -12630 0
 12626 -12627  12628  570  12631 0

c  1-1 --> 0
c    (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0 ∧ -p_570) -> (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧ -b^{15, 39}_0)
c  in CNF:
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_2
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_1
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_0
c  in DIMACS:
 12626  12627 -12628  570 -12629 0
 12626  12627 -12628  570 -12630 0
 12626  12627 -12628  570 -12631 0

c  0-1 --> -1
c    (-b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧ -p_570) -> ( b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0)
c  in CNF:
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨  b^{15, 39}_2
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_1
c     b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨  b^{15, 39}_0
c  in DIMACS:
 12626  12627  12628  570  12629 0
 12626  12627  12628  570 -12630 0
 12626  12627  12628  570  12631 0

c  -1-1 --> -2
c    ( b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧  b^{15, 38}_0 ∧ -p_570) -> ( b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0)
c  in CNF:
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨  b^{15, 39}_2
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨  b^{15, 39}_1
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨  p_570 ∨ -b^{15, 39}_0
c  in DIMACS:
-12626  12627 -12628  570  12629 0
-12626  12627 -12628  570  12630 0
-12626  12627 -12628  570 -12631 0

c  -2-1 --> break 
c    ( b^{15, 38}_2 ∧  b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨  b^{15, 38}_0 ∨  p_570 ∨ break
c  in DIMACS:
-12626 -12627  12628  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 38}_2 ∧ -b^{15, 38}_1 ∧ -b^{15, 38}_0 ∧ true) 
c  in CNF:
c    -b^{15, 38}_2 ∨  b^{15, 38}_1 ∨  b^{15, 38}_0 ∨ false 
c  in DIMACS:
-12626  12627  12628  0

c  3 does not represent an automaton state.
c    -(-b^{15, 38}_2 ∧  b^{15, 38}_1 ∧  b^{15, 38}_0 ∧ true) 
c  in CNF:
c     b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ false 
c  in DIMACS:
 12626 -12627 -12628  0
c  -3 does not represent an automaton state.
c    -( b^{15, 38}_2 ∧  b^{15, 38}_1 ∧  b^{15, 38}_0 ∧ true) 
c  in CNF:
c    -b^{15, 38}_2 ∨ -b^{15, 38}_1 ∨ -b^{15, 38}_0 ∨ false 
c  in DIMACS:
-12626 -12627 -12628  0

c i = 39
c  -2+1 --> -1
c    ( b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧  p_585) -> ( b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0)
c  in CNF:
c    -b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨  b^{15, 40}_2
c    -b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_1
c    -b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨  b^{15, 40}_0
c  in DIMACS:
-12629 -12630  12631 -585  12632 0
-12629 -12630  12631 -585 -12633 0
-12629 -12630  12631 -585  12634 0

c  -1+1 --> 0
c    ( b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0 ∧  p_585) -> (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧ -b^{15, 40}_0)
c  in CNF:
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_2
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_1
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_0
c  in DIMACS:
-12629  12630 -12631 -585 -12632 0
-12629  12630 -12631 -585 -12633 0
-12629  12630 -12631 -585 -12634 0

c  0+1 --> 1
c    (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧  p_585) -> (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0)
c  in CNF:
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_2
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_1
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨  b^{15, 40}_0
c  in DIMACS:
 12629  12630  12631 -585 -12632 0
 12629  12630  12631 -585 -12633 0
 12629  12630  12631 -585  12634 0

c  1+1 --> 2
c    (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0 ∧  p_585) -> (-b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0)
c  in CNF:
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_2
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨  b^{15, 40}_1
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ -p_585 ∨ -b^{15, 40}_0
c  in DIMACS:
 12629  12630 -12631 -585 -12632 0
 12629  12630 -12631 -585  12633 0
 12629  12630 -12631 -585 -12634 0

c  2+1 --> break 
c    (-b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧  p_585) -> break
c  in CNF:
c     b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 12629 -12630  12631 -585 1162 0


c  2-1 --> 1
c    (-b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧ -p_585) -> (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0)
c  in CNF:
c     b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_2
c     b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_1
c     b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨  b^{15, 40}_0
c  in DIMACS:
 12629 -12630  12631  585 -12632 0
 12629 -12630  12631  585 -12633 0
 12629 -12630  12631  585  12634 0

c  1-1 --> 0
c    (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0 ∧ -p_585) -> (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧ -b^{15, 40}_0)
c  in CNF:
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_2
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_1
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_0
c  in DIMACS:
 12629  12630 -12631  585 -12632 0
 12629  12630 -12631  585 -12633 0
 12629  12630 -12631  585 -12634 0

c  0-1 --> -1
c    (-b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧ -p_585) -> ( b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0)
c  in CNF:
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨  b^{15, 40}_2
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_1
c     b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨  b^{15, 40}_0
c  in DIMACS:
 12629  12630  12631  585  12632 0
 12629  12630  12631  585 -12633 0
 12629  12630  12631  585  12634 0

c  -1-1 --> -2
c    ( b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧  b^{15, 39}_0 ∧ -p_585) -> ( b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0)
c  in CNF:
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨  b^{15, 40}_2
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨  b^{15, 40}_1
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨  p_585 ∨ -b^{15, 40}_0
c  in DIMACS:
-12629  12630 -12631  585  12632 0
-12629  12630 -12631  585  12633 0
-12629  12630 -12631  585 -12634 0

c  -2-1 --> break 
c    ( b^{15, 39}_2 ∧  b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨  b^{15, 39}_0 ∨  p_585 ∨ break
c  in DIMACS:
-12629 -12630  12631  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 39}_2 ∧ -b^{15, 39}_1 ∧ -b^{15, 39}_0 ∧ true) 
c  in CNF:
c    -b^{15, 39}_2 ∨  b^{15, 39}_1 ∨  b^{15, 39}_0 ∨ false 
c  in DIMACS:
-12629  12630  12631  0

c  3 does not represent an automaton state.
c    -(-b^{15, 39}_2 ∧  b^{15, 39}_1 ∧  b^{15, 39}_0 ∧ true) 
c  in CNF:
c     b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ false 
c  in DIMACS:
 12629 -12630 -12631  0
c  -3 does not represent an automaton state.
c    -( b^{15, 39}_2 ∧  b^{15, 39}_1 ∧  b^{15, 39}_0 ∧ true) 
c  in CNF:
c    -b^{15, 39}_2 ∨ -b^{15, 39}_1 ∨ -b^{15, 39}_0 ∨ false 
c  in DIMACS:
-12629 -12630 -12631  0

c i = 40
c  -2+1 --> -1
c    ( b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧  p_600) -> ( b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0)
c  in CNF:
c    -b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨  b^{15, 41}_2
c    -b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_1
c    -b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨  b^{15, 41}_0
c  in DIMACS:
-12632 -12633  12634 -600  12635 0
-12632 -12633  12634 -600 -12636 0
-12632 -12633  12634 -600  12637 0

c  -1+1 --> 0
c    ( b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0 ∧  p_600) -> (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧ -b^{15, 41}_0)
c  in CNF:
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_2
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_1
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_0
c  in DIMACS:
-12632  12633 -12634 -600 -12635 0
-12632  12633 -12634 -600 -12636 0
-12632  12633 -12634 -600 -12637 0

c  0+1 --> 1
c    (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧  p_600) -> (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0)
c  in CNF:
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_2
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_1
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨  b^{15, 41}_0
c  in DIMACS:
 12632  12633  12634 -600 -12635 0
 12632  12633  12634 -600 -12636 0
 12632  12633  12634 -600  12637 0

c  1+1 --> 2
c    (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0 ∧  p_600) -> (-b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0)
c  in CNF:
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_2
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨  b^{15, 41}_1
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ -p_600 ∨ -b^{15, 41}_0
c  in DIMACS:
 12632  12633 -12634 -600 -12635 0
 12632  12633 -12634 -600  12636 0
 12632  12633 -12634 -600 -12637 0

c  2+1 --> break 
c    (-b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧  p_600) -> break
c  in CNF:
c     b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 12632 -12633  12634 -600 1162 0


c  2-1 --> 1
c    (-b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧ -p_600) -> (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0)
c  in CNF:
c     b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_2
c     b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_1
c     b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨  b^{15, 41}_0
c  in DIMACS:
 12632 -12633  12634  600 -12635 0
 12632 -12633  12634  600 -12636 0
 12632 -12633  12634  600  12637 0

c  1-1 --> 0
c    (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0 ∧ -p_600) -> (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧ -b^{15, 41}_0)
c  in CNF:
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_2
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_1
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_0
c  in DIMACS:
 12632  12633 -12634  600 -12635 0
 12632  12633 -12634  600 -12636 0
 12632  12633 -12634  600 -12637 0

c  0-1 --> -1
c    (-b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧ -p_600) -> ( b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0)
c  in CNF:
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨  b^{15, 41}_2
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_1
c     b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨  b^{15, 41}_0
c  in DIMACS:
 12632  12633  12634  600  12635 0
 12632  12633  12634  600 -12636 0
 12632  12633  12634  600  12637 0

c  -1-1 --> -2
c    ( b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧  b^{15, 40}_0 ∧ -p_600) -> ( b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0)
c  in CNF:
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨  b^{15, 41}_2
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨  b^{15, 41}_1
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨  p_600 ∨ -b^{15, 41}_0
c  in DIMACS:
-12632  12633 -12634  600  12635 0
-12632  12633 -12634  600  12636 0
-12632  12633 -12634  600 -12637 0

c  -2-1 --> break 
c    ( b^{15, 40}_2 ∧  b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨  b^{15, 40}_0 ∨  p_600 ∨ break
c  in DIMACS:
-12632 -12633  12634  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 40}_2 ∧ -b^{15, 40}_1 ∧ -b^{15, 40}_0 ∧ true) 
c  in CNF:
c    -b^{15, 40}_2 ∨  b^{15, 40}_1 ∨  b^{15, 40}_0 ∨ false 
c  in DIMACS:
-12632  12633  12634  0

c  3 does not represent an automaton state.
c    -(-b^{15, 40}_2 ∧  b^{15, 40}_1 ∧  b^{15, 40}_0 ∧ true) 
c  in CNF:
c     b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ false 
c  in DIMACS:
 12632 -12633 -12634  0
c  -3 does not represent an automaton state.
c    -( b^{15, 40}_2 ∧  b^{15, 40}_1 ∧  b^{15, 40}_0 ∧ true) 
c  in CNF:
c    -b^{15, 40}_2 ∨ -b^{15, 40}_1 ∨ -b^{15, 40}_0 ∨ false 
c  in DIMACS:
-12632 -12633 -12634  0

c i = 41
c  -2+1 --> -1
c    ( b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧  p_615) -> ( b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0)
c  in CNF:
c    -b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨  b^{15, 42}_2
c    -b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_1
c    -b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨  b^{15, 42}_0
c  in DIMACS:
-12635 -12636  12637 -615  12638 0
-12635 -12636  12637 -615 -12639 0
-12635 -12636  12637 -615  12640 0

c  -1+1 --> 0
c    ( b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0 ∧  p_615) -> (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧ -b^{15, 42}_0)
c  in CNF:
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_2
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_1
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_0
c  in DIMACS:
-12635  12636 -12637 -615 -12638 0
-12635  12636 -12637 -615 -12639 0
-12635  12636 -12637 -615 -12640 0

c  0+1 --> 1
c    (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧  p_615) -> (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0)
c  in CNF:
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_2
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_1
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨  b^{15, 42}_0
c  in DIMACS:
 12635  12636  12637 -615 -12638 0
 12635  12636  12637 -615 -12639 0
 12635  12636  12637 -615  12640 0

c  1+1 --> 2
c    (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0 ∧  p_615) -> (-b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0)
c  in CNF:
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_2
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨  b^{15, 42}_1
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ -p_615 ∨ -b^{15, 42}_0
c  in DIMACS:
 12635  12636 -12637 -615 -12638 0
 12635  12636 -12637 -615  12639 0
 12635  12636 -12637 -615 -12640 0

c  2+1 --> break 
c    (-b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧  p_615) -> break
c  in CNF:
c     b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 12635 -12636  12637 -615 1162 0


c  2-1 --> 1
c    (-b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧ -p_615) -> (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0)
c  in CNF:
c     b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_2
c     b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_1
c     b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨  b^{15, 42}_0
c  in DIMACS:
 12635 -12636  12637  615 -12638 0
 12635 -12636  12637  615 -12639 0
 12635 -12636  12637  615  12640 0

c  1-1 --> 0
c    (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0 ∧ -p_615) -> (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧ -b^{15, 42}_0)
c  in CNF:
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_2
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_1
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_0
c  in DIMACS:
 12635  12636 -12637  615 -12638 0
 12635  12636 -12637  615 -12639 0
 12635  12636 -12637  615 -12640 0

c  0-1 --> -1
c    (-b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧ -p_615) -> ( b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0)
c  in CNF:
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨  b^{15, 42}_2
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_1
c     b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨  b^{15, 42}_0
c  in DIMACS:
 12635  12636  12637  615  12638 0
 12635  12636  12637  615 -12639 0
 12635  12636  12637  615  12640 0

c  -1-1 --> -2
c    ( b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧  b^{15, 41}_0 ∧ -p_615) -> ( b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0)
c  in CNF:
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨  b^{15, 42}_2
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨  b^{15, 42}_1
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨  p_615 ∨ -b^{15, 42}_0
c  in DIMACS:
-12635  12636 -12637  615  12638 0
-12635  12636 -12637  615  12639 0
-12635  12636 -12637  615 -12640 0

c  -2-1 --> break 
c    ( b^{15, 41}_2 ∧  b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨  b^{15, 41}_0 ∨  p_615 ∨ break
c  in DIMACS:
-12635 -12636  12637  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 41}_2 ∧ -b^{15, 41}_1 ∧ -b^{15, 41}_0 ∧ true) 
c  in CNF:
c    -b^{15, 41}_2 ∨  b^{15, 41}_1 ∨  b^{15, 41}_0 ∨ false 
c  in DIMACS:
-12635  12636  12637  0

c  3 does not represent an automaton state.
c    -(-b^{15, 41}_2 ∧  b^{15, 41}_1 ∧  b^{15, 41}_0 ∧ true) 
c  in CNF:
c     b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ false 
c  in DIMACS:
 12635 -12636 -12637  0
c  -3 does not represent an automaton state.
c    -( b^{15, 41}_2 ∧  b^{15, 41}_1 ∧  b^{15, 41}_0 ∧ true) 
c  in CNF:
c    -b^{15, 41}_2 ∨ -b^{15, 41}_1 ∨ -b^{15, 41}_0 ∨ false 
c  in DIMACS:
-12635 -12636 -12637  0

c i = 42
c  -2+1 --> -1
c    ( b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧  p_630) -> ( b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0)
c  in CNF:
c    -b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨  b^{15, 43}_2
c    -b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_1
c    -b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨  b^{15, 43}_0
c  in DIMACS:
-12638 -12639  12640 -630  12641 0
-12638 -12639  12640 -630 -12642 0
-12638 -12639  12640 -630  12643 0

c  -1+1 --> 0
c    ( b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0 ∧  p_630) -> (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧ -b^{15, 43}_0)
c  in CNF:
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_2
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_1
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_0
c  in DIMACS:
-12638  12639 -12640 -630 -12641 0
-12638  12639 -12640 -630 -12642 0
-12638  12639 -12640 -630 -12643 0

c  0+1 --> 1
c    (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧  p_630) -> (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0)
c  in CNF:
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_2
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_1
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨  b^{15, 43}_0
c  in DIMACS:
 12638  12639  12640 -630 -12641 0
 12638  12639  12640 -630 -12642 0
 12638  12639  12640 -630  12643 0

c  1+1 --> 2
c    (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0 ∧  p_630) -> (-b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0)
c  in CNF:
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_2
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨  b^{15, 43}_1
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ -p_630 ∨ -b^{15, 43}_0
c  in DIMACS:
 12638  12639 -12640 -630 -12641 0
 12638  12639 -12640 -630  12642 0
 12638  12639 -12640 -630 -12643 0

c  2+1 --> break 
c    (-b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧  p_630) -> break
c  in CNF:
c     b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 12638 -12639  12640 -630 1162 0


c  2-1 --> 1
c    (-b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧ -p_630) -> (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0)
c  in CNF:
c     b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_2
c     b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_1
c     b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨  b^{15, 43}_0
c  in DIMACS:
 12638 -12639  12640  630 -12641 0
 12638 -12639  12640  630 -12642 0
 12638 -12639  12640  630  12643 0

c  1-1 --> 0
c    (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0 ∧ -p_630) -> (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧ -b^{15, 43}_0)
c  in CNF:
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_2
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_1
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_0
c  in DIMACS:
 12638  12639 -12640  630 -12641 0
 12638  12639 -12640  630 -12642 0
 12638  12639 -12640  630 -12643 0

c  0-1 --> -1
c    (-b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧ -p_630) -> ( b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0)
c  in CNF:
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨  b^{15, 43}_2
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_1
c     b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨  b^{15, 43}_0
c  in DIMACS:
 12638  12639  12640  630  12641 0
 12638  12639  12640  630 -12642 0
 12638  12639  12640  630  12643 0

c  -1-1 --> -2
c    ( b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧  b^{15, 42}_0 ∧ -p_630) -> ( b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0)
c  in CNF:
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨  b^{15, 43}_2
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨  b^{15, 43}_1
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨  p_630 ∨ -b^{15, 43}_0
c  in DIMACS:
-12638  12639 -12640  630  12641 0
-12638  12639 -12640  630  12642 0
-12638  12639 -12640  630 -12643 0

c  -2-1 --> break 
c    ( b^{15, 42}_2 ∧  b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨  b^{15, 42}_0 ∨  p_630 ∨ break
c  in DIMACS:
-12638 -12639  12640  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 42}_2 ∧ -b^{15, 42}_1 ∧ -b^{15, 42}_0 ∧ true) 
c  in CNF:
c    -b^{15, 42}_2 ∨  b^{15, 42}_1 ∨  b^{15, 42}_0 ∨ false 
c  in DIMACS:
-12638  12639  12640  0

c  3 does not represent an automaton state.
c    -(-b^{15, 42}_2 ∧  b^{15, 42}_1 ∧  b^{15, 42}_0 ∧ true) 
c  in CNF:
c     b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ false 
c  in DIMACS:
 12638 -12639 -12640  0
c  -3 does not represent an automaton state.
c    -( b^{15, 42}_2 ∧  b^{15, 42}_1 ∧  b^{15, 42}_0 ∧ true) 
c  in CNF:
c    -b^{15, 42}_2 ∨ -b^{15, 42}_1 ∨ -b^{15, 42}_0 ∨ false 
c  in DIMACS:
-12638 -12639 -12640  0

c i = 43
c  -2+1 --> -1
c    ( b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧  p_645) -> ( b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0)
c  in CNF:
c    -b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨  b^{15, 44}_2
c    -b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_1
c    -b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨  b^{15, 44}_0
c  in DIMACS:
-12641 -12642  12643 -645  12644 0
-12641 -12642  12643 -645 -12645 0
-12641 -12642  12643 -645  12646 0

c  -1+1 --> 0
c    ( b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0 ∧  p_645) -> (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧ -b^{15, 44}_0)
c  in CNF:
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_2
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_1
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_0
c  in DIMACS:
-12641  12642 -12643 -645 -12644 0
-12641  12642 -12643 -645 -12645 0
-12641  12642 -12643 -645 -12646 0

c  0+1 --> 1
c    (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧  p_645) -> (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0)
c  in CNF:
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_2
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_1
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨  b^{15, 44}_0
c  in DIMACS:
 12641  12642  12643 -645 -12644 0
 12641  12642  12643 -645 -12645 0
 12641  12642  12643 -645  12646 0

c  1+1 --> 2
c    (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0 ∧  p_645) -> (-b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0)
c  in CNF:
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_2
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨  b^{15, 44}_1
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ -p_645 ∨ -b^{15, 44}_0
c  in DIMACS:
 12641  12642 -12643 -645 -12644 0
 12641  12642 -12643 -645  12645 0
 12641  12642 -12643 -645 -12646 0

c  2+1 --> break 
c    (-b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧  p_645) -> break
c  in CNF:
c     b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 12641 -12642  12643 -645 1162 0


c  2-1 --> 1
c    (-b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧ -p_645) -> (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0)
c  in CNF:
c     b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_2
c     b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_1
c     b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨  b^{15, 44}_0
c  in DIMACS:
 12641 -12642  12643  645 -12644 0
 12641 -12642  12643  645 -12645 0
 12641 -12642  12643  645  12646 0

c  1-1 --> 0
c    (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0 ∧ -p_645) -> (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧ -b^{15, 44}_0)
c  in CNF:
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_2
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_1
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_0
c  in DIMACS:
 12641  12642 -12643  645 -12644 0
 12641  12642 -12643  645 -12645 0
 12641  12642 -12643  645 -12646 0

c  0-1 --> -1
c    (-b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧ -p_645) -> ( b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0)
c  in CNF:
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨  b^{15, 44}_2
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_1
c     b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨  b^{15, 44}_0
c  in DIMACS:
 12641  12642  12643  645  12644 0
 12641  12642  12643  645 -12645 0
 12641  12642  12643  645  12646 0

c  -1-1 --> -2
c    ( b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧  b^{15, 43}_0 ∧ -p_645) -> ( b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0)
c  in CNF:
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨  b^{15, 44}_2
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨  b^{15, 44}_1
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨  p_645 ∨ -b^{15, 44}_0
c  in DIMACS:
-12641  12642 -12643  645  12644 0
-12641  12642 -12643  645  12645 0
-12641  12642 -12643  645 -12646 0

c  -2-1 --> break 
c    ( b^{15, 43}_2 ∧  b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨  b^{15, 43}_0 ∨  p_645 ∨ break
c  in DIMACS:
-12641 -12642  12643  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 43}_2 ∧ -b^{15, 43}_1 ∧ -b^{15, 43}_0 ∧ true) 
c  in CNF:
c    -b^{15, 43}_2 ∨  b^{15, 43}_1 ∨  b^{15, 43}_0 ∨ false 
c  in DIMACS:
-12641  12642  12643  0

c  3 does not represent an automaton state.
c    -(-b^{15, 43}_2 ∧  b^{15, 43}_1 ∧  b^{15, 43}_0 ∧ true) 
c  in CNF:
c     b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ false 
c  in DIMACS:
 12641 -12642 -12643  0
c  -3 does not represent an automaton state.
c    -( b^{15, 43}_2 ∧  b^{15, 43}_1 ∧  b^{15, 43}_0 ∧ true) 
c  in CNF:
c    -b^{15, 43}_2 ∨ -b^{15, 43}_1 ∨ -b^{15, 43}_0 ∨ false 
c  in DIMACS:
-12641 -12642 -12643  0

c i = 44
c  -2+1 --> -1
c    ( b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧  p_660) -> ( b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0)
c  in CNF:
c    -b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨  b^{15, 45}_2
c    -b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_1
c    -b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨  b^{15, 45}_0
c  in DIMACS:
-12644 -12645  12646 -660  12647 0
-12644 -12645  12646 -660 -12648 0
-12644 -12645  12646 -660  12649 0

c  -1+1 --> 0
c    ( b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0 ∧  p_660) -> (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧ -b^{15, 45}_0)
c  in CNF:
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_2
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_1
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_0
c  in DIMACS:
-12644  12645 -12646 -660 -12647 0
-12644  12645 -12646 -660 -12648 0
-12644  12645 -12646 -660 -12649 0

c  0+1 --> 1
c    (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧  p_660) -> (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0)
c  in CNF:
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_2
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_1
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨  b^{15, 45}_0
c  in DIMACS:
 12644  12645  12646 -660 -12647 0
 12644  12645  12646 -660 -12648 0
 12644  12645  12646 -660  12649 0

c  1+1 --> 2
c    (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0 ∧  p_660) -> (-b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0)
c  in CNF:
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_2
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨  b^{15, 45}_1
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ -p_660 ∨ -b^{15, 45}_0
c  in DIMACS:
 12644  12645 -12646 -660 -12647 0
 12644  12645 -12646 -660  12648 0
 12644  12645 -12646 -660 -12649 0

c  2+1 --> break 
c    (-b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧  p_660) -> break
c  in CNF:
c     b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 12644 -12645  12646 -660 1162 0


c  2-1 --> 1
c    (-b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧ -p_660) -> (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0)
c  in CNF:
c     b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_2
c     b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_1
c     b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨  b^{15, 45}_0
c  in DIMACS:
 12644 -12645  12646  660 -12647 0
 12644 -12645  12646  660 -12648 0
 12644 -12645  12646  660  12649 0

c  1-1 --> 0
c    (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0 ∧ -p_660) -> (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧ -b^{15, 45}_0)
c  in CNF:
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_2
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_1
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_0
c  in DIMACS:
 12644  12645 -12646  660 -12647 0
 12644  12645 -12646  660 -12648 0
 12644  12645 -12646  660 -12649 0

c  0-1 --> -1
c    (-b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧ -p_660) -> ( b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0)
c  in CNF:
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨  b^{15, 45}_2
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_1
c     b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨  b^{15, 45}_0
c  in DIMACS:
 12644  12645  12646  660  12647 0
 12644  12645  12646  660 -12648 0
 12644  12645  12646  660  12649 0

c  -1-1 --> -2
c    ( b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧  b^{15, 44}_0 ∧ -p_660) -> ( b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0)
c  in CNF:
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨  b^{15, 45}_2
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨  b^{15, 45}_1
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨  p_660 ∨ -b^{15, 45}_0
c  in DIMACS:
-12644  12645 -12646  660  12647 0
-12644  12645 -12646  660  12648 0
-12644  12645 -12646  660 -12649 0

c  -2-1 --> break 
c    ( b^{15, 44}_2 ∧  b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨  b^{15, 44}_0 ∨  p_660 ∨ break
c  in DIMACS:
-12644 -12645  12646  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 44}_2 ∧ -b^{15, 44}_1 ∧ -b^{15, 44}_0 ∧ true) 
c  in CNF:
c    -b^{15, 44}_2 ∨  b^{15, 44}_1 ∨  b^{15, 44}_0 ∨ false 
c  in DIMACS:
-12644  12645  12646  0

c  3 does not represent an automaton state.
c    -(-b^{15, 44}_2 ∧  b^{15, 44}_1 ∧  b^{15, 44}_0 ∧ true) 
c  in CNF:
c     b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ false 
c  in DIMACS:
 12644 -12645 -12646  0
c  -3 does not represent an automaton state.
c    -( b^{15, 44}_2 ∧  b^{15, 44}_1 ∧  b^{15, 44}_0 ∧ true) 
c  in CNF:
c    -b^{15, 44}_2 ∨ -b^{15, 44}_1 ∨ -b^{15, 44}_0 ∨ false 
c  in DIMACS:
-12644 -12645 -12646  0

c i = 45
c  -2+1 --> -1
c    ( b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧  p_675) -> ( b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0)
c  in CNF:
c    -b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨  b^{15, 46}_2
c    -b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_1
c    -b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨  b^{15, 46}_0
c  in DIMACS:
-12647 -12648  12649 -675  12650 0
-12647 -12648  12649 -675 -12651 0
-12647 -12648  12649 -675  12652 0

c  -1+1 --> 0
c    ( b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0 ∧  p_675) -> (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧ -b^{15, 46}_0)
c  in CNF:
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_2
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_1
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_0
c  in DIMACS:
-12647  12648 -12649 -675 -12650 0
-12647  12648 -12649 -675 -12651 0
-12647  12648 -12649 -675 -12652 0

c  0+1 --> 1
c    (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧  p_675) -> (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0)
c  in CNF:
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_2
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_1
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨  b^{15, 46}_0
c  in DIMACS:
 12647  12648  12649 -675 -12650 0
 12647  12648  12649 -675 -12651 0
 12647  12648  12649 -675  12652 0

c  1+1 --> 2
c    (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0 ∧  p_675) -> (-b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0)
c  in CNF:
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_2
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨  b^{15, 46}_1
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ -p_675 ∨ -b^{15, 46}_0
c  in DIMACS:
 12647  12648 -12649 -675 -12650 0
 12647  12648 -12649 -675  12651 0
 12647  12648 -12649 -675 -12652 0

c  2+1 --> break 
c    (-b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧  p_675) -> break
c  in CNF:
c     b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 12647 -12648  12649 -675 1162 0


c  2-1 --> 1
c    (-b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧ -p_675) -> (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0)
c  in CNF:
c     b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_2
c     b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_1
c     b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨  b^{15, 46}_0
c  in DIMACS:
 12647 -12648  12649  675 -12650 0
 12647 -12648  12649  675 -12651 0
 12647 -12648  12649  675  12652 0

c  1-1 --> 0
c    (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0 ∧ -p_675) -> (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧ -b^{15, 46}_0)
c  in CNF:
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_2
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_1
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_0
c  in DIMACS:
 12647  12648 -12649  675 -12650 0
 12647  12648 -12649  675 -12651 0
 12647  12648 -12649  675 -12652 0

c  0-1 --> -1
c    (-b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧ -p_675) -> ( b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0)
c  in CNF:
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨  b^{15, 46}_2
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_1
c     b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨  b^{15, 46}_0
c  in DIMACS:
 12647  12648  12649  675  12650 0
 12647  12648  12649  675 -12651 0
 12647  12648  12649  675  12652 0

c  -1-1 --> -2
c    ( b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧  b^{15, 45}_0 ∧ -p_675) -> ( b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0)
c  in CNF:
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨  b^{15, 46}_2
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨  b^{15, 46}_1
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨  p_675 ∨ -b^{15, 46}_0
c  in DIMACS:
-12647  12648 -12649  675  12650 0
-12647  12648 -12649  675  12651 0
-12647  12648 -12649  675 -12652 0

c  -2-1 --> break 
c    ( b^{15, 45}_2 ∧  b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨  b^{15, 45}_0 ∨  p_675 ∨ break
c  in DIMACS:
-12647 -12648  12649  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 45}_2 ∧ -b^{15, 45}_1 ∧ -b^{15, 45}_0 ∧ true) 
c  in CNF:
c    -b^{15, 45}_2 ∨  b^{15, 45}_1 ∨  b^{15, 45}_0 ∨ false 
c  in DIMACS:
-12647  12648  12649  0

c  3 does not represent an automaton state.
c    -(-b^{15, 45}_2 ∧  b^{15, 45}_1 ∧  b^{15, 45}_0 ∧ true) 
c  in CNF:
c     b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ false 
c  in DIMACS:
 12647 -12648 -12649  0
c  -3 does not represent an automaton state.
c    -( b^{15, 45}_2 ∧  b^{15, 45}_1 ∧  b^{15, 45}_0 ∧ true) 
c  in CNF:
c    -b^{15, 45}_2 ∨ -b^{15, 45}_1 ∨ -b^{15, 45}_0 ∨ false 
c  in DIMACS:
-12647 -12648 -12649  0

c i = 46
c  -2+1 --> -1
c    ( b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧  p_690) -> ( b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0)
c  in CNF:
c    -b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨  b^{15, 47}_2
c    -b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_1
c    -b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨  b^{15, 47}_0
c  in DIMACS:
-12650 -12651  12652 -690  12653 0
-12650 -12651  12652 -690 -12654 0
-12650 -12651  12652 -690  12655 0

c  -1+1 --> 0
c    ( b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0 ∧  p_690) -> (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧ -b^{15, 47}_0)
c  in CNF:
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_2
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_1
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_0
c  in DIMACS:
-12650  12651 -12652 -690 -12653 0
-12650  12651 -12652 -690 -12654 0
-12650  12651 -12652 -690 -12655 0

c  0+1 --> 1
c    (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧  p_690) -> (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0)
c  in CNF:
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_2
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_1
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨  b^{15, 47}_0
c  in DIMACS:
 12650  12651  12652 -690 -12653 0
 12650  12651  12652 -690 -12654 0
 12650  12651  12652 -690  12655 0

c  1+1 --> 2
c    (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0 ∧  p_690) -> (-b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0)
c  in CNF:
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_2
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨  b^{15, 47}_1
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ -p_690 ∨ -b^{15, 47}_0
c  in DIMACS:
 12650  12651 -12652 -690 -12653 0
 12650  12651 -12652 -690  12654 0
 12650  12651 -12652 -690 -12655 0

c  2+1 --> break 
c    (-b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧  p_690) -> break
c  in CNF:
c     b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 12650 -12651  12652 -690 1162 0


c  2-1 --> 1
c    (-b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧ -p_690) -> (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0)
c  in CNF:
c     b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_2
c     b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_1
c     b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨  b^{15, 47}_0
c  in DIMACS:
 12650 -12651  12652  690 -12653 0
 12650 -12651  12652  690 -12654 0
 12650 -12651  12652  690  12655 0

c  1-1 --> 0
c    (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0 ∧ -p_690) -> (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧ -b^{15, 47}_0)
c  in CNF:
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_2
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_1
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_0
c  in DIMACS:
 12650  12651 -12652  690 -12653 0
 12650  12651 -12652  690 -12654 0
 12650  12651 -12652  690 -12655 0

c  0-1 --> -1
c    (-b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧ -p_690) -> ( b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0)
c  in CNF:
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨  b^{15, 47}_2
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_1
c     b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨  b^{15, 47}_0
c  in DIMACS:
 12650  12651  12652  690  12653 0
 12650  12651  12652  690 -12654 0
 12650  12651  12652  690  12655 0

c  -1-1 --> -2
c    ( b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧  b^{15, 46}_0 ∧ -p_690) -> ( b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0)
c  in CNF:
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨  b^{15, 47}_2
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨  b^{15, 47}_1
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨  p_690 ∨ -b^{15, 47}_0
c  in DIMACS:
-12650  12651 -12652  690  12653 0
-12650  12651 -12652  690  12654 0
-12650  12651 -12652  690 -12655 0

c  -2-1 --> break 
c    ( b^{15, 46}_2 ∧  b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨  b^{15, 46}_0 ∨  p_690 ∨ break
c  in DIMACS:
-12650 -12651  12652  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 46}_2 ∧ -b^{15, 46}_1 ∧ -b^{15, 46}_0 ∧ true) 
c  in CNF:
c    -b^{15, 46}_2 ∨  b^{15, 46}_1 ∨  b^{15, 46}_0 ∨ false 
c  in DIMACS:
-12650  12651  12652  0

c  3 does not represent an automaton state.
c    -(-b^{15, 46}_2 ∧  b^{15, 46}_1 ∧  b^{15, 46}_0 ∧ true) 
c  in CNF:
c     b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ false 
c  in DIMACS:
 12650 -12651 -12652  0
c  -3 does not represent an automaton state.
c    -( b^{15, 46}_2 ∧  b^{15, 46}_1 ∧  b^{15, 46}_0 ∧ true) 
c  in CNF:
c    -b^{15, 46}_2 ∨ -b^{15, 46}_1 ∨ -b^{15, 46}_0 ∨ false 
c  in DIMACS:
-12650 -12651 -12652  0

c i = 47
c  -2+1 --> -1
c    ( b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧  p_705) -> ( b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0)
c  in CNF:
c    -b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨  b^{15, 48}_2
c    -b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_1
c    -b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨  b^{15, 48}_0
c  in DIMACS:
-12653 -12654  12655 -705  12656 0
-12653 -12654  12655 -705 -12657 0
-12653 -12654  12655 -705  12658 0

c  -1+1 --> 0
c    ( b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0 ∧  p_705) -> (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧ -b^{15, 48}_0)
c  in CNF:
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_2
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_1
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_0
c  in DIMACS:
-12653  12654 -12655 -705 -12656 0
-12653  12654 -12655 -705 -12657 0
-12653  12654 -12655 -705 -12658 0

c  0+1 --> 1
c    (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧  p_705) -> (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0)
c  in CNF:
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_2
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_1
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨  b^{15, 48}_0
c  in DIMACS:
 12653  12654  12655 -705 -12656 0
 12653  12654  12655 -705 -12657 0
 12653  12654  12655 -705  12658 0

c  1+1 --> 2
c    (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0 ∧  p_705) -> (-b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0)
c  in CNF:
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_2
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨  b^{15, 48}_1
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ -p_705 ∨ -b^{15, 48}_0
c  in DIMACS:
 12653  12654 -12655 -705 -12656 0
 12653  12654 -12655 -705  12657 0
 12653  12654 -12655 -705 -12658 0

c  2+1 --> break 
c    (-b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧  p_705) -> break
c  in CNF:
c     b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 12653 -12654  12655 -705 1162 0


c  2-1 --> 1
c    (-b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧ -p_705) -> (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0)
c  in CNF:
c     b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_2
c     b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_1
c     b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨  b^{15, 48}_0
c  in DIMACS:
 12653 -12654  12655  705 -12656 0
 12653 -12654  12655  705 -12657 0
 12653 -12654  12655  705  12658 0

c  1-1 --> 0
c    (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0 ∧ -p_705) -> (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧ -b^{15, 48}_0)
c  in CNF:
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_2
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_1
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_0
c  in DIMACS:
 12653  12654 -12655  705 -12656 0
 12653  12654 -12655  705 -12657 0
 12653  12654 -12655  705 -12658 0

c  0-1 --> -1
c    (-b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧ -p_705) -> ( b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0)
c  in CNF:
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨  b^{15, 48}_2
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_1
c     b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨  b^{15, 48}_0
c  in DIMACS:
 12653  12654  12655  705  12656 0
 12653  12654  12655  705 -12657 0
 12653  12654  12655  705  12658 0

c  -1-1 --> -2
c    ( b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧  b^{15, 47}_0 ∧ -p_705) -> ( b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0)
c  in CNF:
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨  b^{15, 48}_2
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨  b^{15, 48}_1
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨  p_705 ∨ -b^{15, 48}_0
c  in DIMACS:
-12653  12654 -12655  705  12656 0
-12653  12654 -12655  705  12657 0
-12653  12654 -12655  705 -12658 0

c  -2-1 --> break 
c    ( b^{15, 47}_2 ∧  b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨  b^{15, 47}_0 ∨  p_705 ∨ break
c  in DIMACS:
-12653 -12654  12655  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 47}_2 ∧ -b^{15, 47}_1 ∧ -b^{15, 47}_0 ∧ true) 
c  in CNF:
c    -b^{15, 47}_2 ∨  b^{15, 47}_1 ∨  b^{15, 47}_0 ∨ false 
c  in DIMACS:
-12653  12654  12655  0

c  3 does not represent an automaton state.
c    -(-b^{15, 47}_2 ∧  b^{15, 47}_1 ∧  b^{15, 47}_0 ∧ true) 
c  in CNF:
c     b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ false 
c  in DIMACS:
 12653 -12654 -12655  0
c  -3 does not represent an automaton state.
c    -( b^{15, 47}_2 ∧  b^{15, 47}_1 ∧  b^{15, 47}_0 ∧ true) 
c  in CNF:
c    -b^{15, 47}_2 ∨ -b^{15, 47}_1 ∨ -b^{15, 47}_0 ∨ false 
c  in DIMACS:
-12653 -12654 -12655  0

c i = 48
c  -2+1 --> -1
c    ( b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧  p_720) -> ( b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0)
c  in CNF:
c    -b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨  b^{15, 49}_2
c    -b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_1
c    -b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨  b^{15, 49}_0
c  in DIMACS:
-12656 -12657  12658 -720  12659 0
-12656 -12657  12658 -720 -12660 0
-12656 -12657  12658 -720  12661 0

c  -1+1 --> 0
c    ( b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0 ∧  p_720) -> (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧ -b^{15, 49}_0)
c  in CNF:
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_2
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_1
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_0
c  in DIMACS:
-12656  12657 -12658 -720 -12659 0
-12656  12657 -12658 -720 -12660 0
-12656  12657 -12658 -720 -12661 0

c  0+1 --> 1
c    (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧  p_720) -> (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0)
c  in CNF:
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_2
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_1
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨  b^{15, 49}_0
c  in DIMACS:
 12656  12657  12658 -720 -12659 0
 12656  12657  12658 -720 -12660 0
 12656  12657  12658 -720  12661 0

c  1+1 --> 2
c    (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0 ∧  p_720) -> (-b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0)
c  in CNF:
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_2
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨  b^{15, 49}_1
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ -p_720 ∨ -b^{15, 49}_0
c  in DIMACS:
 12656  12657 -12658 -720 -12659 0
 12656  12657 -12658 -720  12660 0
 12656  12657 -12658 -720 -12661 0

c  2+1 --> break 
c    (-b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧  p_720) -> break
c  in CNF:
c     b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 12656 -12657  12658 -720 1162 0


c  2-1 --> 1
c    (-b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧ -p_720) -> (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0)
c  in CNF:
c     b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_2
c     b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_1
c     b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨  b^{15, 49}_0
c  in DIMACS:
 12656 -12657  12658  720 -12659 0
 12656 -12657  12658  720 -12660 0
 12656 -12657  12658  720  12661 0

c  1-1 --> 0
c    (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0 ∧ -p_720) -> (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧ -b^{15, 49}_0)
c  in CNF:
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_2
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_1
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_0
c  in DIMACS:
 12656  12657 -12658  720 -12659 0
 12656  12657 -12658  720 -12660 0
 12656  12657 -12658  720 -12661 0

c  0-1 --> -1
c    (-b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧ -p_720) -> ( b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0)
c  in CNF:
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨  b^{15, 49}_2
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_1
c     b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨  b^{15, 49}_0
c  in DIMACS:
 12656  12657  12658  720  12659 0
 12656  12657  12658  720 -12660 0
 12656  12657  12658  720  12661 0

c  -1-1 --> -2
c    ( b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧  b^{15, 48}_0 ∧ -p_720) -> ( b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0)
c  in CNF:
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨  b^{15, 49}_2
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨  b^{15, 49}_1
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨  p_720 ∨ -b^{15, 49}_0
c  in DIMACS:
-12656  12657 -12658  720  12659 0
-12656  12657 -12658  720  12660 0
-12656  12657 -12658  720 -12661 0

c  -2-1 --> break 
c    ( b^{15, 48}_2 ∧  b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨  b^{15, 48}_0 ∨  p_720 ∨ break
c  in DIMACS:
-12656 -12657  12658  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 48}_2 ∧ -b^{15, 48}_1 ∧ -b^{15, 48}_0 ∧ true) 
c  in CNF:
c    -b^{15, 48}_2 ∨  b^{15, 48}_1 ∨  b^{15, 48}_0 ∨ false 
c  in DIMACS:
-12656  12657  12658  0

c  3 does not represent an automaton state.
c    -(-b^{15, 48}_2 ∧  b^{15, 48}_1 ∧  b^{15, 48}_0 ∧ true) 
c  in CNF:
c     b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ false 
c  in DIMACS:
 12656 -12657 -12658  0
c  -3 does not represent an automaton state.
c    -( b^{15, 48}_2 ∧  b^{15, 48}_1 ∧  b^{15, 48}_0 ∧ true) 
c  in CNF:
c    -b^{15, 48}_2 ∨ -b^{15, 48}_1 ∨ -b^{15, 48}_0 ∨ false 
c  in DIMACS:
-12656 -12657 -12658  0

c i = 49
c  -2+1 --> -1
c    ( b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧  p_735) -> ( b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0)
c  in CNF:
c    -b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨  b^{15, 50}_2
c    -b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_1
c    -b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨  b^{15, 50}_0
c  in DIMACS:
-12659 -12660  12661 -735  12662 0
-12659 -12660  12661 -735 -12663 0
-12659 -12660  12661 -735  12664 0

c  -1+1 --> 0
c    ( b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0 ∧  p_735) -> (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧ -b^{15, 50}_0)
c  in CNF:
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_2
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_1
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_0
c  in DIMACS:
-12659  12660 -12661 -735 -12662 0
-12659  12660 -12661 -735 -12663 0
-12659  12660 -12661 -735 -12664 0

c  0+1 --> 1
c    (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧  p_735) -> (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0)
c  in CNF:
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_2
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_1
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨  b^{15, 50}_0
c  in DIMACS:
 12659  12660  12661 -735 -12662 0
 12659  12660  12661 -735 -12663 0
 12659  12660  12661 -735  12664 0

c  1+1 --> 2
c    (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0 ∧  p_735) -> (-b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0)
c  in CNF:
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_2
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨  b^{15, 50}_1
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ -p_735 ∨ -b^{15, 50}_0
c  in DIMACS:
 12659  12660 -12661 -735 -12662 0
 12659  12660 -12661 -735  12663 0
 12659  12660 -12661 -735 -12664 0

c  2+1 --> break 
c    (-b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧  p_735) -> break
c  in CNF:
c     b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 12659 -12660  12661 -735 1162 0


c  2-1 --> 1
c    (-b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧ -p_735) -> (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0)
c  in CNF:
c     b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_2
c     b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_1
c     b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨  b^{15, 50}_0
c  in DIMACS:
 12659 -12660  12661  735 -12662 0
 12659 -12660  12661  735 -12663 0
 12659 -12660  12661  735  12664 0

c  1-1 --> 0
c    (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0 ∧ -p_735) -> (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧ -b^{15, 50}_0)
c  in CNF:
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_2
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_1
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_0
c  in DIMACS:
 12659  12660 -12661  735 -12662 0
 12659  12660 -12661  735 -12663 0
 12659  12660 -12661  735 -12664 0

c  0-1 --> -1
c    (-b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧ -p_735) -> ( b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0)
c  in CNF:
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨  b^{15, 50}_2
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_1
c     b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨  b^{15, 50}_0
c  in DIMACS:
 12659  12660  12661  735  12662 0
 12659  12660  12661  735 -12663 0
 12659  12660  12661  735  12664 0

c  -1-1 --> -2
c    ( b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧  b^{15, 49}_0 ∧ -p_735) -> ( b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0)
c  in CNF:
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨  b^{15, 50}_2
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨  b^{15, 50}_1
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨  p_735 ∨ -b^{15, 50}_0
c  in DIMACS:
-12659  12660 -12661  735  12662 0
-12659  12660 -12661  735  12663 0
-12659  12660 -12661  735 -12664 0

c  -2-1 --> break 
c    ( b^{15, 49}_2 ∧  b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨  b^{15, 49}_0 ∨  p_735 ∨ break
c  in DIMACS:
-12659 -12660  12661  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 49}_2 ∧ -b^{15, 49}_1 ∧ -b^{15, 49}_0 ∧ true) 
c  in CNF:
c    -b^{15, 49}_2 ∨  b^{15, 49}_1 ∨  b^{15, 49}_0 ∨ false 
c  in DIMACS:
-12659  12660  12661  0

c  3 does not represent an automaton state.
c    -(-b^{15, 49}_2 ∧  b^{15, 49}_1 ∧  b^{15, 49}_0 ∧ true) 
c  in CNF:
c     b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ false 
c  in DIMACS:
 12659 -12660 -12661  0
c  -3 does not represent an automaton state.
c    -( b^{15, 49}_2 ∧  b^{15, 49}_1 ∧  b^{15, 49}_0 ∧ true) 
c  in CNF:
c    -b^{15, 49}_2 ∨ -b^{15, 49}_1 ∨ -b^{15, 49}_0 ∨ false 
c  in DIMACS:
-12659 -12660 -12661  0

c i = 50
c  -2+1 --> -1
c    ( b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧  p_750) -> ( b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0)
c  in CNF:
c    -b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨  b^{15, 51}_2
c    -b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_1
c    -b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨  b^{15, 51}_0
c  in DIMACS:
-12662 -12663  12664 -750  12665 0
-12662 -12663  12664 -750 -12666 0
-12662 -12663  12664 -750  12667 0

c  -1+1 --> 0
c    ( b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0 ∧  p_750) -> (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧ -b^{15, 51}_0)
c  in CNF:
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_2
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_1
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_0
c  in DIMACS:
-12662  12663 -12664 -750 -12665 0
-12662  12663 -12664 -750 -12666 0
-12662  12663 -12664 -750 -12667 0

c  0+1 --> 1
c    (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧  p_750) -> (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0)
c  in CNF:
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_2
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_1
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨  b^{15, 51}_0
c  in DIMACS:
 12662  12663  12664 -750 -12665 0
 12662  12663  12664 -750 -12666 0
 12662  12663  12664 -750  12667 0

c  1+1 --> 2
c    (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0 ∧  p_750) -> (-b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0)
c  in CNF:
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_2
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨  b^{15, 51}_1
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ -p_750 ∨ -b^{15, 51}_0
c  in DIMACS:
 12662  12663 -12664 -750 -12665 0
 12662  12663 -12664 -750  12666 0
 12662  12663 -12664 -750 -12667 0

c  2+1 --> break 
c    (-b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧  p_750) -> break
c  in CNF:
c     b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 12662 -12663  12664 -750 1162 0


c  2-1 --> 1
c    (-b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧ -p_750) -> (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0)
c  in CNF:
c     b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_2
c     b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_1
c     b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨  b^{15, 51}_0
c  in DIMACS:
 12662 -12663  12664  750 -12665 0
 12662 -12663  12664  750 -12666 0
 12662 -12663  12664  750  12667 0

c  1-1 --> 0
c    (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0 ∧ -p_750) -> (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧ -b^{15, 51}_0)
c  in CNF:
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_2
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_1
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_0
c  in DIMACS:
 12662  12663 -12664  750 -12665 0
 12662  12663 -12664  750 -12666 0
 12662  12663 -12664  750 -12667 0

c  0-1 --> -1
c    (-b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧ -p_750) -> ( b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0)
c  in CNF:
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨  b^{15, 51}_2
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_1
c     b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨  b^{15, 51}_0
c  in DIMACS:
 12662  12663  12664  750  12665 0
 12662  12663  12664  750 -12666 0
 12662  12663  12664  750  12667 0

c  -1-1 --> -2
c    ( b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧  b^{15, 50}_0 ∧ -p_750) -> ( b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0)
c  in CNF:
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨  b^{15, 51}_2
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨  b^{15, 51}_1
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨  p_750 ∨ -b^{15, 51}_0
c  in DIMACS:
-12662  12663 -12664  750  12665 0
-12662  12663 -12664  750  12666 0
-12662  12663 -12664  750 -12667 0

c  -2-1 --> break 
c    ( b^{15, 50}_2 ∧  b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨  b^{15, 50}_0 ∨  p_750 ∨ break
c  in DIMACS:
-12662 -12663  12664  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 50}_2 ∧ -b^{15, 50}_1 ∧ -b^{15, 50}_0 ∧ true) 
c  in CNF:
c    -b^{15, 50}_2 ∨  b^{15, 50}_1 ∨  b^{15, 50}_0 ∨ false 
c  in DIMACS:
-12662  12663  12664  0

c  3 does not represent an automaton state.
c    -(-b^{15, 50}_2 ∧  b^{15, 50}_1 ∧  b^{15, 50}_0 ∧ true) 
c  in CNF:
c     b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ false 
c  in DIMACS:
 12662 -12663 -12664  0
c  -3 does not represent an automaton state.
c    -( b^{15, 50}_2 ∧  b^{15, 50}_1 ∧  b^{15, 50}_0 ∧ true) 
c  in CNF:
c    -b^{15, 50}_2 ∨ -b^{15, 50}_1 ∨ -b^{15, 50}_0 ∨ false 
c  in DIMACS:
-12662 -12663 -12664  0

c i = 51
c  -2+1 --> -1
c    ( b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧  p_765) -> ( b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0)
c  in CNF:
c    -b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨  b^{15, 52}_2
c    -b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_1
c    -b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨  b^{15, 52}_0
c  in DIMACS:
-12665 -12666  12667 -765  12668 0
-12665 -12666  12667 -765 -12669 0
-12665 -12666  12667 -765  12670 0

c  -1+1 --> 0
c    ( b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0 ∧  p_765) -> (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧ -b^{15, 52}_0)
c  in CNF:
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_2
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_1
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_0
c  in DIMACS:
-12665  12666 -12667 -765 -12668 0
-12665  12666 -12667 -765 -12669 0
-12665  12666 -12667 -765 -12670 0

c  0+1 --> 1
c    (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧  p_765) -> (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0)
c  in CNF:
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_2
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_1
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨  b^{15, 52}_0
c  in DIMACS:
 12665  12666  12667 -765 -12668 0
 12665  12666  12667 -765 -12669 0
 12665  12666  12667 -765  12670 0

c  1+1 --> 2
c    (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0 ∧  p_765) -> (-b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0)
c  in CNF:
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_2
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨  b^{15, 52}_1
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ -p_765 ∨ -b^{15, 52}_0
c  in DIMACS:
 12665  12666 -12667 -765 -12668 0
 12665  12666 -12667 -765  12669 0
 12665  12666 -12667 -765 -12670 0

c  2+1 --> break 
c    (-b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧  p_765) -> break
c  in CNF:
c     b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 12665 -12666  12667 -765 1162 0


c  2-1 --> 1
c    (-b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧ -p_765) -> (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0)
c  in CNF:
c     b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_2
c     b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_1
c     b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨  b^{15, 52}_0
c  in DIMACS:
 12665 -12666  12667  765 -12668 0
 12665 -12666  12667  765 -12669 0
 12665 -12666  12667  765  12670 0

c  1-1 --> 0
c    (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0 ∧ -p_765) -> (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧ -b^{15, 52}_0)
c  in CNF:
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_2
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_1
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_0
c  in DIMACS:
 12665  12666 -12667  765 -12668 0
 12665  12666 -12667  765 -12669 0
 12665  12666 -12667  765 -12670 0

c  0-1 --> -1
c    (-b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧ -p_765) -> ( b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0)
c  in CNF:
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨  b^{15, 52}_2
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_1
c     b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨  b^{15, 52}_0
c  in DIMACS:
 12665  12666  12667  765  12668 0
 12665  12666  12667  765 -12669 0
 12665  12666  12667  765  12670 0

c  -1-1 --> -2
c    ( b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧  b^{15, 51}_0 ∧ -p_765) -> ( b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0)
c  in CNF:
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨  b^{15, 52}_2
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨  b^{15, 52}_1
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨  p_765 ∨ -b^{15, 52}_0
c  in DIMACS:
-12665  12666 -12667  765  12668 0
-12665  12666 -12667  765  12669 0
-12665  12666 -12667  765 -12670 0

c  -2-1 --> break 
c    ( b^{15, 51}_2 ∧  b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨  b^{15, 51}_0 ∨  p_765 ∨ break
c  in DIMACS:
-12665 -12666  12667  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 51}_2 ∧ -b^{15, 51}_1 ∧ -b^{15, 51}_0 ∧ true) 
c  in CNF:
c    -b^{15, 51}_2 ∨  b^{15, 51}_1 ∨  b^{15, 51}_0 ∨ false 
c  in DIMACS:
-12665  12666  12667  0

c  3 does not represent an automaton state.
c    -(-b^{15, 51}_2 ∧  b^{15, 51}_1 ∧  b^{15, 51}_0 ∧ true) 
c  in CNF:
c     b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ false 
c  in DIMACS:
 12665 -12666 -12667  0
c  -3 does not represent an automaton state.
c    -( b^{15, 51}_2 ∧  b^{15, 51}_1 ∧  b^{15, 51}_0 ∧ true) 
c  in CNF:
c    -b^{15, 51}_2 ∨ -b^{15, 51}_1 ∨ -b^{15, 51}_0 ∨ false 
c  in DIMACS:
-12665 -12666 -12667  0

c i = 52
c  -2+1 --> -1
c    ( b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧  p_780) -> ( b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0)
c  in CNF:
c    -b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨  b^{15, 53}_2
c    -b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_1
c    -b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨  b^{15, 53}_0
c  in DIMACS:
-12668 -12669  12670 -780  12671 0
-12668 -12669  12670 -780 -12672 0
-12668 -12669  12670 -780  12673 0

c  -1+1 --> 0
c    ( b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0 ∧  p_780) -> (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧ -b^{15, 53}_0)
c  in CNF:
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_2
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_1
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_0
c  in DIMACS:
-12668  12669 -12670 -780 -12671 0
-12668  12669 -12670 -780 -12672 0
-12668  12669 -12670 -780 -12673 0

c  0+1 --> 1
c    (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧  p_780) -> (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0)
c  in CNF:
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_2
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_1
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨  b^{15, 53}_0
c  in DIMACS:
 12668  12669  12670 -780 -12671 0
 12668  12669  12670 -780 -12672 0
 12668  12669  12670 -780  12673 0

c  1+1 --> 2
c    (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0 ∧  p_780) -> (-b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0)
c  in CNF:
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_2
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨  b^{15, 53}_1
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ -p_780 ∨ -b^{15, 53}_0
c  in DIMACS:
 12668  12669 -12670 -780 -12671 0
 12668  12669 -12670 -780  12672 0
 12668  12669 -12670 -780 -12673 0

c  2+1 --> break 
c    (-b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧  p_780) -> break
c  in CNF:
c     b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 12668 -12669  12670 -780 1162 0


c  2-1 --> 1
c    (-b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧ -p_780) -> (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0)
c  in CNF:
c     b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_2
c     b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_1
c     b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨  b^{15, 53}_0
c  in DIMACS:
 12668 -12669  12670  780 -12671 0
 12668 -12669  12670  780 -12672 0
 12668 -12669  12670  780  12673 0

c  1-1 --> 0
c    (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0 ∧ -p_780) -> (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧ -b^{15, 53}_0)
c  in CNF:
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_2
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_1
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_0
c  in DIMACS:
 12668  12669 -12670  780 -12671 0
 12668  12669 -12670  780 -12672 0
 12668  12669 -12670  780 -12673 0

c  0-1 --> -1
c    (-b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧ -p_780) -> ( b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0)
c  in CNF:
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨  b^{15, 53}_2
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_1
c     b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨  b^{15, 53}_0
c  in DIMACS:
 12668  12669  12670  780  12671 0
 12668  12669  12670  780 -12672 0
 12668  12669  12670  780  12673 0

c  -1-1 --> -2
c    ( b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧  b^{15, 52}_0 ∧ -p_780) -> ( b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0)
c  in CNF:
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨  b^{15, 53}_2
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨  b^{15, 53}_1
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨  p_780 ∨ -b^{15, 53}_0
c  in DIMACS:
-12668  12669 -12670  780  12671 0
-12668  12669 -12670  780  12672 0
-12668  12669 -12670  780 -12673 0

c  -2-1 --> break 
c    ( b^{15, 52}_2 ∧  b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨  b^{15, 52}_0 ∨  p_780 ∨ break
c  in DIMACS:
-12668 -12669  12670  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 52}_2 ∧ -b^{15, 52}_1 ∧ -b^{15, 52}_0 ∧ true) 
c  in CNF:
c    -b^{15, 52}_2 ∨  b^{15, 52}_1 ∨  b^{15, 52}_0 ∨ false 
c  in DIMACS:
-12668  12669  12670  0

c  3 does not represent an automaton state.
c    -(-b^{15, 52}_2 ∧  b^{15, 52}_1 ∧  b^{15, 52}_0 ∧ true) 
c  in CNF:
c     b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ false 
c  in DIMACS:
 12668 -12669 -12670  0
c  -3 does not represent an automaton state.
c    -( b^{15, 52}_2 ∧  b^{15, 52}_1 ∧  b^{15, 52}_0 ∧ true) 
c  in CNF:
c    -b^{15, 52}_2 ∨ -b^{15, 52}_1 ∨ -b^{15, 52}_0 ∨ false 
c  in DIMACS:
-12668 -12669 -12670  0

c i = 53
c  -2+1 --> -1
c    ( b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧  p_795) -> ( b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0)
c  in CNF:
c    -b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨  b^{15, 54}_2
c    -b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_1
c    -b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨  b^{15, 54}_0
c  in DIMACS:
-12671 -12672  12673 -795  12674 0
-12671 -12672  12673 -795 -12675 0
-12671 -12672  12673 -795  12676 0

c  -1+1 --> 0
c    ( b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0 ∧  p_795) -> (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧ -b^{15, 54}_0)
c  in CNF:
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_2
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_1
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_0
c  in DIMACS:
-12671  12672 -12673 -795 -12674 0
-12671  12672 -12673 -795 -12675 0
-12671  12672 -12673 -795 -12676 0

c  0+1 --> 1
c    (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧  p_795) -> (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0)
c  in CNF:
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_2
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_1
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨  b^{15, 54}_0
c  in DIMACS:
 12671  12672  12673 -795 -12674 0
 12671  12672  12673 -795 -12675 0
 12671  12672  12673 -795  12676 0

c  1+1 --> 2
c    (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0 ∧  p_795) -> (-b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0)
c  in CNF:
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_2
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨  b^{15, 54}_1
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ -p_795 ∨ -b^{15, 54}_0
c  in DIMACS:
 12671  12672 -12673 -795 -12674 0
 12671  12672 -12673 -795  12675 0
 12671  12672 -12673 -795 -12676 0

c  2+1 --> break 
c    (-b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧  p_795) -> break
c  in CNF:
c     b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 12671 -12672  12673 -795 1162 0


c  2-1 --> 1
c    (-b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧ -p_795) -> (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0)
c  in CNF:
c     b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_2
c     b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_1
c     b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨  b^{15, 54}_0
c  in DIMACS:
 12671 -12672  12673  795 -12674 0
 12671 -12672  12673  795 -12675 0
 12671 -12672  12673  795  12676 0

c  1-1 --> 0
c    (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0 ∧ -p_795) -> (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧ -b^{15, 54}_0)
c  in CNF:
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_2
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_1
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_0
c  in DIMACS:
 12671  12672 -12673  795 -12674 0
 12671  12672 -12673  795 -12675 0
 12671  12672 -12673  795 -12676 0

c  0-1 --> -1
c    (-b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧ -p_795) -> ( b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0)
c  in CNF:
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨  b^{15, 54}_2
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_1
c     b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨  b^{15, 54}_0
c  in DIMACS:
 12671  12672  12673  795  12674 0
 12671  12672  12673  795 -12675 0
 12671  12672  12673  795  12676 0

c  -1-1 --> -2
c    ( b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧  b^{15, 53}_0 ∧ -p_795) -> ( b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0)
c  in CNF:
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨  b^{15, 54}_2
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨  b^{15, 54}_1
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨  p_795 ∨ -b^{15, 54}_0
c  in DIMACS:
-12671  12672 -12673  795  12674 0
-12671  12672 -12673  795  12675 0
-12671  12672 -12673  795 -12676 0

c  -2-1 --> break 
c    ( b^{15, 53}_2 ∧  b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨  b^{15, 53}_0 ∨  p_795 ∨ break
c  in DIMACS:
-12671 -12672  12673  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 53}_2 ∧ -b^{15, 53}_1 ∧ -b^{15, 53}_0 ∧ true) 
c  in CNF:
c    -b^{15, 53}_2 ∨  b^{15, 53}_1 ∨  b^{15, 53}_0 ∨ false 
c  in DIMACS:
-12671  12672  12673  0

c  3 does not represent an automaton state.
c    -(-b^{15, 53}_2 ∧  b^{15, 53}_1 ∧  b^{15, 53}_0 ∧ true) 
c  in CNF:
c     b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ false 
c  in DIMACS:
 12671 -12672 -12673  0
c  -3 does not represent an automaton state.
c    -( b^{15, 53}_2 ∧  b^{15, 53}_1 ∧  b^{15, 53}_0 ∧ true) 
c  in CNF:
c    -b^{15, 53}_2 ∨ -b^{15, 53}_1 ∨ -b^{15, 53}_0 ∨ false 
c  in DIMACS:
-12671 -12672 -12673  0

c i = 54
c  -2+1 --> -1
c    ( b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧  p_810) -> ( b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0)
c  in CNF:
c    -b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨  b^{15, 55}_2
c    -b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_1
c    -b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨  b^{15, 55}_0
c  in DIMACS:
-12674 -12675  12676 -810  12677 0
-12674 -12675  12676 -810 -12678 0
-12674 -12675  12676 -810  12679 0

c  -1+1 --> 0
c    ( b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0 ∧  p_810) -> (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧ -b^{15, 55}_0)
c  in CNF:
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_2
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_1
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_0
c  in DIMACS:
-12674  12675 -12676 -810 -12677 0
-12674  12675 -12676 -810 -12678 0
-12674  12675 -12676 -810 -12679 0

c  0+1 --> 1
c    (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧  p_810) -> (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0)
c  in CNF:
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_2
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_1
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨  b^{15, 55}_0
c  in DIMACS:
 12674  12675  12676 -810 -12677 0
 12674  12675  12676 -810 -12678 0
 12674  12675  12676 -810  12679 0

c  1+1 --> 2
c    (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0 ∧  p_810) -> (-b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0)
c  in CNF:
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_2
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨  b^{15, 55}_1
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ -p_810 ∨ -b^{15, 55}_0
c  in DIMACS:
 12674  12675 -12676 -810 -12677 0
 12674  12675 -12676 -810  12678 0
 12674  12675 -12676 -810 -12679 0

c  2+1 --> break 
c    (-b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧  p_810) -> break
c  in CNF:
c     b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 12674 -12675  12676 -810 1162 0


c  2-1 --> 1
c    (-b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧ -p_810) -> (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0)
c  in CNF:
c     b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_2
c     b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_1
c     b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨  b^{15, 55}_0
c  in DIMACS:
 12674 -12675  12676  810 -12677 0
 12674 -12675  12676  810 -12678 0
 12674 -12675  12676  810  12679 0

c  1-1 --> 0
c    (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0 ∧ -p_810) -> (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧ -b^{15, 55}_0)
c  in CNF:
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_2
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_1
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_0
c  in DIMACS:
 12674  12675 -12676  810 -12677 0
 12674  12675 -12676  810 -12678 0
 12674  12675 -12676  810 -12679 0

c  0-1 --> -1
c    (-b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧ -p_810) -> ( b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0)
c  in CNF:
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨  b^{15, 55}_2
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_1
c     b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨  b^{15, 55}_0
c  in DIMACS:
 12674  12675  12676  810  12677 0
 12674  12675  12676  810 -12678 0
 12674  12675  12676  810  12679 0

c  -1-1 --> -2
c    ( b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧  b^{15, 54}_0 ∧ -p_810) -> ( b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0)
c  in CNF:
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨  b^{15, 55}_2
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨  b^{15, 55}_1
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨  p_810 ∨ -b^{15, 55}_0
c  in DIMACS:
-12674  12675 -12676  810  12677 0
-12674  12675 -12676  810  12678 0
-12674  12675 -12676  810 -12679 0

c  -2-1 --> break 
c    ( b^{15, 54}_2 ∧  b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨  b^{15, 54}_0 ∨  p_810 ∨ break
c  in DIMACS:
-12674 -12675  12676  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 54}_2 ∧ -b^{15, 54}_1 ∧ -b^{15, 54}_0 ∧ true) 
c  in CNF:
c    -b^{15, 54}_2 ∨  b^{15, 54}_1 ∨  b^{15, 54}_0 ∨ false 
c  in DIMACS:
-12674  12675  12676  0

c  3 does not represent an automaton state.
c    -(-b^{15, 54}_2 ∧  b^{15, 54}_1 ∧  b^{15, 54}_0 ∧ true) 
c  in CNF:
c     b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ false 
c  in DIMACS:
 12674 -12675 -12676  0
c  -3 does not represent an automaton state.
c    -( b^{15, 54}_2 ∧  b^{15, 54}_1 ∧  b^{15, 54}_0 ∧ true) 
c  in CNF:
c    -b^{15, 54}_2 ∨ -b^{15, 54}_1 ∨ -b^{15, 54}_0 ∨ false 
c  in DIMACS:
-12674 -12675 -12676  0

c i = 55
c  -2+1 --> -1
c    ( b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧  p_825) -> ( b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0)
c  in CNF:
c    -b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨  b^{15, 56}_2
c    -b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_1
c    -b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨  b^{15, 56}_0
c  in DIMACS:
-12677 -12678  12679 -825  12680 0
-12677 -12678  12679 -825 -12681 0
-12677 -12678  12679 -825  12682 0

c  -1+1 --> 0
c    ( b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0 ∧  p_825) -> (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧ -b^{15, 56}_0)
c  in CNF:
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_2
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_1
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_0
c  in DIMACS:
-12677  12678 -12679 -825 -12680 0
-12677  12678 -12679 -825 -12681 0
-12677  12678 -12679 -825 -12682 0

c  0+1 --> 1
c    (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧  p_825) -> (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0)
c  in CNF:
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_2
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_1
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨  b^{15, 56}_0
c  in DIMACS:
 12677  12678  12679 -825 -12680 0
 12677  12678  12679 -825 -12681 0
 12677  12678  12679 -825  12682 0

c  1+1 --> 2
c    (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0 ∧  p_825) -> (-b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0)
c  in CNF:
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_2
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨  b^{15, 56}_1
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ -p_825 ∨ -b^{15, 56}_0
c  in DIMACS:
 12677  12678 -12679 -825 -12680 0
 12677  12678 -12679 -825  12681 0
 12677  12678 -12679 -825 -12682 0

c  2+1 --> break 
c    (-b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧  p_825) -> break
c  in CNF:
c     b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 12677 -12678  12679 -825 1162 0


c  2-1 --> 1
c    (-b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧ -p_825) -> (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0)
c  in CNF:
c     b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_2
c     b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_1
c     b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨  b^{15, 56}_0
c  in DIMACS:
 12677 -12678  12679  825 -12680 0
 12677 -12678  12679  825 -12681 0
 12677 -12678  12679  825  12682 0

c  1-1 --> 0
c    (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0 ∧ -p_825) -> (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧ -b^{15, 56}_0)
c  in CNF:
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_2
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_1
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_0
c  in DIMACS:
 12677  12678 -12679  825 -12680 0
 12677  12678 -12679  825 -12681 0
 12677  12678 -12679  825 -12682 0

c  0-1 --> -1
c    (-b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧ -p_825) -> ( b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0)
c  in CNF:
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨  b^{15, 56}_2
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_1
c     b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨  b^{15, 56}_0
c  in DIMACS:
 12677  12678  12679  825  12680 0
 12677  12678  12679  825 -12681 0
 12677  12678  12679  825  12682 0

c  -1-1 --> -2
c    ( b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧  b^{15, 55}_0 ∧ -p_825) -> ( b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0)
c  in CNF:
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨  b^{15, 56}_2
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨  b^{15, 56}_1
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨  p_825 ∨ -b^{15, 56}_0
c  in DIMACS:
-12677  12678 -12679  825  12680 0
-12677  12678 -12679  825  12681 0
-12677  12678 -12679  825 -12682 0

c  -2-1 --> break 
c    ( b^{15, 55}_2 ∧  b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨  b^{15, 55}_0 ∨  p_825 ∨ break
c  in DIMACS:
-12677 -12678  12679  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 55}_2 ∧ -b^{15, 55}_1 ∧ -b^{15, 55}_0 ∧ true) 
c  in CNF:
c    -b^{15, 55}_2 ∨  b^{15, 55}_1 ∨  b^{15, 55}_0 ∨ false 
c  in DIMACS:
-12677  12678  12679  0

c  3 does not represent an automaton state.
c    -(-b^{15, 55}_2 ∧  b^{15, 55}_1 ∧  b^{15, 55}_0 ∧ true) 
c  in CNF:
c     b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ false 
c  in DIMACS:
 12677 -12678 -12679  0
c  -3 does not represent an automaton state.
c    -( b^{15, 55}_2 ∧  b^{15, 55}_1 ∧  b^{15, 55}_0 ∧ true) 
c  in CNF:
c    -b^{15, 55}_2 ∨ -b^{15, 55}_1 ∨ -b^{15, 55}_0 ∨ false 
c  in DIMACS:
-12677 -12678 -12679  0

c i = 56
c  -2+1 --> -1
c    ( b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧  p_840) -> ( b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0)
c  in CNF:
c    -b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨  b^{15, 57}_2
c    -b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_1
c    -b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨  b^{15, 57}_0
c  in DIMACS:
-12680 -12681  12682 -840  12683 0
-12680 -12681  12682 -840 -12684 0
-12680 -12681  12682 -840  12685 0

c  -1+1 --> 0
c    ( b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0 ∧  p_840) -> (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧ -b^{15, 57}_0)
c  in CNF:
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_2
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_1
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_0
c  in DIMACS:
-12680  12681 -12682 -840 -12683 0
-12680  12681 -12682 -840 -12684 0
-12680  12681 -12682 -840 -12685 0

c  0+1 --> 1
c    (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧  p_840) -> (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0)
c  in CNF:
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_2
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_1
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨  b^{15, 57}_0
c  in DIMACS:
 12680  12681  12682 -840 -12683 0
 12680  12681  12682 -840 -12684 0
 12680  12681  12682 -840  12685 0

c  1+1 --> 2
c    (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0 ∧  p_840) -> (-b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0)
c  in CNF:
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_2
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨  b^{15, 57}_1
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ -p_840 ∨ -b^{15, 57}_0
c  in DIMACS:
 12680  12681 -12682 -840 -12683 0
 12680  12681 -12682 -840  12684 0
 12680  12681 -12682 -840 -12685 0

c  2+1 --> break 
c    (-b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧  p_840) -> break
c  in CNF:
c     b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 12680 -12681  12682 -840 1162 0


c  2-1 --> 1
c    (-b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧ -p_840) -> (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0)
c  in CNF:
c     b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_2
c     b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_1
c     b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨  b^{15, 57}_0
c  in DIMACS:
 12680 -12681  12682  840 -12683 0
 12680 -12681  12682  840 -12684 0
 12680 -12681  12682  840  12685 0

c  1-1 --> 0
c    (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0 ∧ -p_840) -> (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧ -b^{15, 57}_0)
c  in CNF:
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_2
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_1
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_0
c  in DIMACS:
 12680  12681 -12682  840 -12683 0
 12680  12681 -12682  840 -12684 0
 12680  12681 -12682  840 -12685 0

c  0-1 --> -1
c    (-b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧ -p_840) -> ( b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0)
c  in CNF:
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨  b^{15, 57}_2
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_1
c     b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨  b^{15, 57}_0
c  in DIMACS:
 12680  12681  12682  840  12683 0
 12680  12681  12682  840 -12684 0
 12680  12681  12682  840  12685 0

c  -1-1 --> -2
c    ( b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧  b^{15, 56}_0 ∧ -p_840) -> ( b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0)
c  in CNF:
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨  b^{15, 57}_2
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨  b^{15, 57}_1
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨  p_840 ∨ -b^{15, 57}_0
c  in DIMACS:
-12680  12681 -12682  840  12683 0
-12680  12681 -12682  840  12684 0
-12680  12681 -12682  840 -12685 0

c  -2-1 --> break 
c    ( b^{15, 56}_2 ∧  b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨  b^{15, 56}_0 ∨  p_840 ∨ break
c  in DIMACS:
-12680 -12681  12682  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 56}_2 ∧ -b^{15, 56}_1 ∧ -b^{15, 56}_0 ∧ true) 
c  in CNF:
c    -b^{15, 56}_2 ∨  b^{15, 56}_1 ∨  b^{15, 56}_0 ∨ false 
c  in DIMACS:
-12680  12681  12682  0

c  3 does not represent an automaton state.
c    -(-b^{15, 56}_2 ∧  b^{15, 56}_1 ∧  b^{15, 56}_0 ∧ true) 
c  in CNF:
c     b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ false 
c  in DIMACS:
 12680 -12681 -12682  0
c  -3 does not represent an automaton state.
c    -( b^{15, 56}_2 ∧  b^{15, 56}_1 ∧  b^{15, 56}_0 ∧ true) 
c  in CNF:
c    -b^{15, 56}_2 ∨ -b^{15, 56}_1 ∨ -b^{15, 56}_0 ∨ false 
c  in DIMACS:
-12680 -12681 -12682  0

c i = 57
c  -2+1 --> -1
c    ( b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧  p_855) -> ( b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0)
c  in CNF:
c    -b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨  b^{15, 58}_2
c    -b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_1
c    -b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨  b^{15, 58}_0
c  in DIMACS:
-12683 -12684  12685 -855  12686 0
-12683 -12684  12685 -855 -12687 0
-12683 -12684  12685 -855  12688 0

c  -1+1 --> 0
c    ( b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0 ∧  p_855) -> (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧ -b^{15, 58}_0)
c  in CNF:
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_2
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_1
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_0
c  in DIMACS:
-12683  12684 -12685 -855 -12686 0
-12683  12684 -12685 -855 -12687 0
-12683  12684 -12685 -855 -12688 0

c  0+1 --> 1
c    (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧  p_855) -> (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0)
c  in CNF:
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_2
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_1
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨  b^{15, 58}_0
c  in DIMACS:
 12683  12684  12685 -855 -12686 0
 12683  12684  12685 -855 -12687 0
 12683  12684  12685 -855  12688 0

c  1+1 --> 2
c    (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0 ∧  p_855) -> (-b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0)
c  in CNF:
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_2
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨  b^{15, 58}_1
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ -p_855 ∨ -b^{15, 58}_0
c  in DIMACS:
 12683  12684 -12685 -855 -12686 0
 12683  12684 -12685 -855  12687 0
 12683  12684 -12685 -855 -12688 0

c  2+1 --> break 
c    (-b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧  p_855) -> break
c  in CNF:
c     b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 12683 -12684  12685 -855 1162 0


c  2-1 --> 1
c    (-b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧ -p_855) -> (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0)
c  in CNF:
c     b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_2
c     b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_1
c     b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨  b^{15, 58}_0
c  in DIMACS:
 12683 -12684  12685  855 -12686 0
 12683 -12684  12685  855 -12687 0
 12683 -12684  12685  855  12688 0

c  1-1 --> 0
c    (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0 ∧ -p_855) -> (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧ -b^{15, 58}_0)
c  in CNF:
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_2
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_1
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_0
c  in DIMACS:
 12683  12684 -12685  855 -12686 0
 12683  12684 -12685  855 -12687 0
 12683  12684 -12685  855 -12688 0

c  0-1 --> -1
c    (-b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧ -p_855) -> ( b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0)
c  in CNF:
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨  b^{15, 58}_2
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_1
c     b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨  b^{15, 58}_0
c  in DIMACS:
 12683  12684  12685  855  12686 0
 12683  12684  12685  855 -12687 0
 12683  12684  12685  855  12688 0

c  -1-1 --> -2
c    ( b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧  b^{15, 57}_0 ∧ -p_855) -> ( b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0)
c  in CNF:
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨  b^{15, 58}_2
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨  b^{15, 58}_1
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨  p_855 ∨ -b^{15, 58}_0
c  in DIMACS:
-12683  12684 -12685  855  12686 0
-12683  12684 -12685  855  12687 0
-12683  12684 -12685  855 -12688 0

c  -2-1 --> break 
c    ( b^{15, 57}_2 ∧  b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨  b^{15, 57}_0 ∨  p_855 ∨ break
c  in DIMACS:
-12683 -12684  12685  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 57}_2 ∧ -b^{15, 57}_1 ∧ -b^{15, 57}_0 ∧ true) 
c  in CNF:
c    -b^{15, 57}_2 ∨  b^{15, 57}_1 ∨  b^{15, 57}_0 ∨ false 
c  in DIMACS:
-12683  12684  12685  0

c  3 does not represent an automaton state.
c    -(-b^{15, 57}_2 ∧  b^{15, 57}_1 ∧  b^{15, 57}_0 ∧ true) 
c  in CNF:
c     b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ false 
c  in DIMACS:
 12683 -12684 -12685  0
c  -3 does not represent an automaton state.
c    -( b^{15, 57}_2 ∧  b^{15, 57}_1 ∧  b^{15, 57}_0 ∧ true) 
c  in CNF:
c    -b^{15, 57}_2 ∨ -b^{15, 57}_1 ∨ -b^{15, 57}_0 ∨ false 
c  in DIMACS:
-12683 -12684 -12685  0

c i = 58
c  -2+1 --> -1
c    ( b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧  p_870) -> ( b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0)
c  in CNF:
c    -b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨  b^{15, 59}_2
c    -b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_1
c    -b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨  b^{15, 59}_0
c  in DIMACS:
-12686 -12687  12688 -870  12689 0
-12686 -12687  12688 -870 -12690 0
-12686 -12687  12688 -870  12691 0

c  -1+1 --> 0
c    ( b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0 ∧  p_870) -> (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧ -b^{15, 59}_0)
c  in CNF:
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_2
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_1
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_0
c  in DIMACS:
-12686  12687 -12688 -870 -12689 0
-12686  12687 -12688 -870 -12690 0
-12686  12687 -12688 -870 -12691 0

c  0+1 --> 1
c    (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧  p_870) -> (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0)
c  in CNF:
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_2
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_1
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨  b^{15, 59}_0
c  in DIMACS:
 12686  12687  12688 -870 -12689 0
 12686  12687  12688 -870 -12690 0
 12686  12687  12688 -870  12691 0

c  1+1 --> 2
c    (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0 ∧  p_870) -> (-b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0)
c  in CNF:
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_2
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨  b^{15, 59}_1
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ -p_870 ∨ -b^{15, 59}_0
c  in DIMACS:
 12686  12687 -12688 -870 -12689 0
 12686  12687 -12688 -870  12690 0
 12686  12687 -12688 -870 -12691 0

c  2+1 --> break 
c    (-b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧  p_870) -> break
c  in CNF:
c     b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 12686 -12687  12688 -870 1162 0


c  2-1 --> 1
c    (-b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧ -p_870) -> (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0)
c  in CNF:
c     b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_2
c     b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_1
c     b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨  b^{15, 59}_0
c  in DIMACS:
 12686 -12687  12688  870 -12689 0
 12686 -12687  12688  870 -12690 0
 12686 -12687  12688  870  12691 0

c  1-1 --> 0
c    (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0 ∧ -p_870) -> (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧ -b^{15, 59}_0)
c  in CNF:
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_2
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_1
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_0
c  in DIMACS:
 12686  12687 -12688  870 -12689 0
 12686  12687 -12688  870 -12690 0
 12686  12687 -12688  870 -12691 0

c  0-1 --> -1
c    (-b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧ -p_870) -> ( b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0)
c  in CNF:
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨  b^{15, 59}_2
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_1
c     b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨  b^{15, 59}_0
c  in DIMACS:
 12686  12687  12688  870  12689 0
 12686  12687  12688  870 -12690 0
 12686  12687  12688  870  12691 0

c  -1-1 --> -2
c    ( b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧  b^{15, 58}_0 ∧ -p_870) -> ( b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0)
c  in CNF:
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨  b^{15, 59}_2
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨  b^{15, 59}_1
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨  p_870 ∨ -b^{15, 59}_0
c  in DIMACS:
-12686  12687 -12688  870  12689 0
-12686  12687 -12688  870  12690 0
-12686  12687 -12688  870 -12691 0

c  -2-1 --> break 
c    ( b^{15, 58}_2 ∧  b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨  b^{15, 58}_0 ∨  p_870 ∨ break
c  in DIMACS:
-12686 -12687  12688  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 58}_2 ∧ -b^{15, 58}_1 ∧ -b^{15, 58}_0 ∧ true) 
c  in CNF:
c    -b^{15, 58}_2 ∨  b^{15, 58}_1 ∨  b^{15, 58}_0 ∨ false 
c  in DIMACS:
-12686  12687  12688  0

c  3 does not represent an automaton state.
c    -(-b^{15, 58}_2 ∧  b^{15, 58}_1 ∧  b^{15, 58}_0 ∧ true) 
c  in CNF:
c     b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ false 
c  in DIMACS:
 12686 -12687 -12688  0
c  -3 does not represent an automaton state.
c    -( b^{15, 58}_2 ∧  b^{15, 58}_1 ∧  b^{15, 58}_0 ∧ true) 
c  in CNF:
c    -b^{15, 58}_2 ∨ -b^{15, 58}_1 ∨ -b^{15, 58}_0 ∨ false 
c  in DIMACS:
-12686 -12687 -12688  0

c i = 59
c  -2+1 --> -1
c    ( b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧  p_885) -> ( b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0)
c  in CNF:
c    -b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨  b^{15, 60}_2
c    -b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_1
c    -b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨  b^{15, 60}_0
c  in DIMACS:
-12689 -12690  12691 -885  12692 0
-12689 -12690  12691 -885 -12693 0
-12689 -12690  12691 -885  12694 0

c  -1+1 --> 0
c    ( b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0 ∧  p_885) -> (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧ -b^{15, 60}_0)
c  in CNF:
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_2
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_1
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_0
c  in DIMACS:
-12689  12690 -12691 -885 -12692 0
-12689  12690 -12691 -885 -12693 0
-12689  12690 -12691 -885 -12694 0

c  0+1 --> 1
c    (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧  p_885) -> (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0)
c  in CNF:
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_2
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_1
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨  b^{15, 60}_0
c  in DIMACS:
 12689  12690  12691 -885 -12692 0
 12689  12690  12691 -885 -12693 0
 12689  12690  12691 -885  12694 0

c  1+1 --> 2
c    (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0 ∧  p_885) -> (-b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0)
c  in CNF:
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_2
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨  b^{15, 60}_1
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ -p_885 ∨ -b^{15, 60}_0
c  in DIMACS:
 12689  12690 -12691 -885 -12692 0
 12689  12690 -12691 -885  12693 0
 12689  12690 -12691 -885 -12694 0

c  2+1 --> break 
c    (-b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧  p_885) -> break
c  in CNF:
c     b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 12689 -12690  12691 -885 1162 0


c  2-1 --> 1
c    (-b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧ -p_885) -> (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0)
c  in CNF:
c     b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_2
c     b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_1
c     b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨  b^{15, 60}_0
c  in DIMACS:
 12689 -12690  12691  885 -12692 0
 12689 -12690  12691  885 -12693 0
 12689 -12690  12691  885  12694 0

c  1-1 --> 0
c    (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0 ∧ -p_885) -> (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧ -b^{15, 60}_0)
c  in CNF:
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_2
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_1
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_0
c  in DIMACS:
 12689  12690 -12691  885 -12692 0
 12689  12690 -12691  885 -12693 0
 12689  12690 -12691  885 -12694 0

c  0-1 --> -1
c    (-b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧ -p_885) -> ( b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0)
c  in CNF:
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨  b^{15, 60}_2
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_1
c     b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨  b^{15, 60}_0
c  in DIMACS:
 12689  12690  12691  885  12692 0
 12689  12690  12691  885 -12693 0
 12689  12690  12691  885  12694 0

c  -1-1 --> -2
c    ( b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧  b^{15, 59}_0 ∧ -p_885) -> ( b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0)
c  in CNF:
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨  b^{15, 60}_2
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨  b^{15, 60}_1
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨  p_885 ∨ -b^{15, 60}_0
c  in DIMACS:
-12689  12690 -12691  885  12692 0
-12689  12690 -12691  885  12693 0
-12689  12690 -12691  885 -12694 0

c  -2-1 --> break 
c    ( b^{15, 59}_2 ∧  b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨  b^{15, 59}_0 ∨  p_885 ∨ break
c  in DIMACS:
-12689 -12690  12691  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 59}_2 ∧ -b^{15, 59}_1 ∧ -b^{15, 59}_0 ∧ true) 
c  in CNF:
c    -b^{15, 59}_2 ∨  b^{15, 59}_1 ∨  b^{15, 59}_0 ∨ false 
c  in DIMACS:
-12689  12690  12691  0

c  3 does not represent an automaton state.
c    -(-b^{15, 59}_2 ∧  b^{15, 59}_1 ∧  b^{15, 59}_0 ∧ true) 
c  in CNF:
c     b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ false 
c  in DIMACS:
 12689 -12690 -12691  0
c  -3 does not represent an automaton state.
c    -( b^{15, 59}_2 ∧  b^{15, 59}_1 ∧  b^{15, 59}_0 ∧ true) 
c  in CNF:
c    -b^{15, 59}_2 ∨ -b^{15, 59}_1 ∨ -b^{15, 59}_0 ∨ false 
c  in DIMACS:
-12689 -12690 -12691  0

c i = 60
c  -2+1 --> -1
c    ( b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧  p_900) -> ( b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0)
c  in CNF:
c    -b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨  b^{15, 61}_2
c    -b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_1
c    -b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨  b^{15, 61}_0
c  in DIMACS:
-12692 -12693  12694 -900  12695 0
-12692 -12693  12694 -900 -12696 0
-12692 -12693  12694 -900  12697 0

c  -1+1 --> 0
c    ( b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0 ∧  p_900) -> (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧ -b^{15, 61}_0)
c  in CNF:
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_2
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_1
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_0
c  in DIMACS:
-12692  12693 -12694 -900 -12695 0
-12692  12693 -12694 -900 -12696 0
-12692  12693 -12694 -900 -12697 0

c  0+1 --> 1
c    (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧  p_900) -> (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0)
c  in CNF:
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_2
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_1
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨  b^{15, 61}_0
c  in DIMACS:
 12692  12693  12694 -900 -12695 0
 12692  12693  12694 -900 -12696 0
 12692  12693  12694 -900  12697 0

c  1+1 --> 2
c    (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0 ∧  p_900) -> (-b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0)
c  in CNF:
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_2
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨  b^{15, 61}_1
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ -p_900 ∨ -b^{15, 61}_0
c  in DIMACS:
 12692  12693 -12694 -900 -12695 0
 12692  12693 -12694 -900  12696 0
 12692  12693 -12694 -900 -12697 0

c  2+1 --> break 
c    (-b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧  p_900) -> break
c  in CNF:
c     b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 12692 -12693  12694 -900 1162 0


c  2-1 --> 1
c    (-b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧ -p_900) -> (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0)
c  in CNF:
c     b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_2
c     b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_1
c     b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨  b^{15, 61}_0
c  in DIMACS:
 12692 -12693  12694  900 -12695 0
 12692 -12693  12694  900 -12696 0
 12692 -12693  12694  900  12697 0

c  1-1 --> 0
c    (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0 ∧ -p_900) -> (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧ -b^{15, 61}_0)
c  in CNF:
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_2
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_1
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_0
c  in DIMACS:
 12692  12693 -12694  900 -12695 0
 12692  12693 -12694  900 -12696 0
 12692  12693 -12694  900 -12697 0

c  0-1 --> -1
c    (-b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧ -p_900) -> ( b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0)
c  in CNF:
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨  b^{15, 61}_2
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_1
c     b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨  b^{15, 61}_0
c  in DIMACS:
 12692  12693  12694  900  12695 0
 12692  12693  12694  900 -12696 0
 12692  12693  12694  900  12697 0

c  -1-1 --> -2
c    ( b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧  b^{15, 60}_0 ∧ -p_900) -> ( b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0)
c  in CNF:
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨  b^{15, 61}_2
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨  b^{15, 61}_1
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨  p_900 ∨ -b^{15, 61}_0
c  in DIMACS:
-12692  12693 -12694  900  12695 0
-12692  12693 -12694  900  12696 0
-12692  12693 -12694  900 -12697 0

c  -2-1 --> break 
c    ( b^{15, 60}_2 ∧  b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨  b^{15, 60}_0 ∨  p_900 ∨ break
c  in DIMACS:
-12692 -12693  12694  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 60}_2 ∧ -b^{15, 60}_1 ∧ -b^{15, 60}_0 ∧ true) 
c  in CNF:
c    -b^{15, 60}_2 ∨  b^{15, 60}_1 ∨  b^{15, 60}_0 ∨ false 
c  in DIMACS:
-12692  12693  12694  0

c  3 does not represent an automaton state.
c    -(-b^{15, 60}_2 ∧  b^{15, 60}_1 ∧  b^{15, 60}_0 ∧ true) 
c  in CNF:
c     b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ false 
c  in DIMACS:
 12692 -12693 -12694  0
c  -3 does not represent an automaton state.
c    -( b^{15, 60}_2 ∧  b^{15, 60}_1 ∧  b^{15, 60}_0 ∧ true) 
c  in CNF:
c    -b^{15, 60}_2 ∨ -b^{15, 60}_1 ∨ -b^{15, 60}_0 ∨ false 
c  in DIMACS:
-12692 -12693 -12694  0

c i = 61
c  -2+1 --> -1
c    ( b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧  p_915) -> ( b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0)
c  in CNF:
c    -b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨  b^{15, 62}_2
c    -b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_1
c    -b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨  b^{15, 62}_0
c  in DIMACS:
-12695 -12696  12697 -915  12698 0
-12695 -12696  12697 -915 -12699 0
-12695 -12696  12697 -915  12700 0

c  -1+1 --> 0
c    ( b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0 ∧  p_915) -> (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧ -b^{15, 62}_0)
c  in CNF:
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_2
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_1
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_0
c  in DIMACS:
-12695  12696 -12697 -915 -12698 0
-12695  12696 -12697 -915 -12699 0
-12695  12696 -12697 -915 -12700 0

c  0+1 --> 1
c    (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧  p_915) -> (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0)
c  in CNF:
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_2
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_1
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨  b^{15, 62}_0
c  in DIMACS:
 12695  12696  12697 -915 -12698 0
 12695  12696  12697 -915 -12699 0
 12695  12696  12697 -915  12700 0

c  1+1 --> 2
c    (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0 ∧  p_915) -> (-b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0)
c  in CNF:
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_2
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨  b^{15, 62}_1
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ -p_915 ∨ -b^{15, 62}_0
c  in DIMACS:
 12695  12696 -12697 -915 -12698 0
 12695  12696 -12697 -915  12699 0
 12695  12696 -12697 -915 -12700 0

c  2+1 --> break 
c    (-b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧  p_915) -> break
c  in CNF:
c     b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 12695 -12696  12697 -915 1162 0


c  2-1 --> 1
c    (-b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧ -p_915) -> (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0)
c  in CNF:
c     b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_2
c     b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_1
c     b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨  b^{15, 62}_0
c  in DIMACS:
 12695 -12696  12697  915 -12698 0
 12695 -12696  12697  915 -12699 0
 12695 -12696  12697  915  12700 0

c  1-1 --> 0
c    (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0 ∧ -p_915) -> (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧ -b^{15, 62}_0)
c  in CNF:
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_2
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_1
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_0
c  in DIMACS:
 12695  12696 -12697  915 -12698 0
 12695  12696 -12697  915 -12699 0
 12695  12696 -12697  915 -12700 0

c  0-1 --> -1
c    (-b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧ -p_915) -> ( b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0)
c  in CNF:
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨  b^{15, 62}_2
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_1
c     b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨  b^{15, 62}_0
c  in DIMACS:
 12695  12696  12697  915  12698 0
 12695  12696  12697  915 -12699 0
 12695  12696  12697  915  12700 0

c  -1-1 --> -2
c    ( b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧  b^{15, 61}_0 ∧ -p_915) -> ( b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0)
c  in CNF:
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨  b^{15, 62}_2
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨  b^{15, 62}_1
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨  p_915 ∨ -b^{15, 62}_0
c  in DIMACS:
-12695  12696 -12697  915  12698 0
-12695  12696 -12697  915  12699 0
-12695  12696 -12697  915 -12700 0

c  -2-1 --> break 
c    ( b^{15, 61}_2 ∧  b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨  b^{15, 61}_0 ∨  p_915 ∨ break
c  in DIMACS:
-12695 -12696  12697  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 61}_2 ∧ -b^{15, 61}_1 ∧ -b^{15, 61}_0 ∧ true) 
c  in CNF:
c    -b^{15, 61}_2 ∨  b^{15, 61}_1 ∨  b^{15, 61}_0 ∨ false 
c  in DIMACS:
-12695  12696  12697  0

c  3 does not represent an automaton state.
c    -(-b^{15, 61}_2 ∧  b^{15, 61}_1 ∧  b^{15, 61}_0 ∧ true) 
c  in CNF:
c     b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ false 
c  in DIMACS:
 12695 -12696 -12697  0
c  -3 does not represent an automaton state.
c    -( b^{15, 61}_2 ∧  b^{15, 61}_1 ∧  b^{15, 61}_0 ∧ true) 
c  in CNF:
c    -b^{15, 61}_2 ∨ -b^{15, 61}_1 ∨ -b^{15, 61}_0 ∨ false 
c  in DIMACS:
-12695 -12696 -12697  0

c i = 62
c  -2+1 --> -1
c    ( b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧  p_930) -> ( b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0)
c  in CNF:
c    -b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨  b^{15, 63}_2
c    -b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_1
c    -b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨  b^{15, 63}_0
c  in DIMACS:
-12698 -12699  12700 -930  12701 0
-12698 -12699  12700 -930 -12702 0
-12698 -12699  12700 -930  12703 0

c  -1+1 --> 0
c    ( b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0 ∧  p_930) -> (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧ -b^{15, 63}_0)
c  in CNF:
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_2
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_1
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_0
c  in DIMACS:
-12698  12699 -12700 -930 -12701 0
-12698  12699 -12700 -930 -12702 0
-12698  12699 -12700 -930 -12703 0

c  0+1 --> 1
c    (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧  p_930) -> (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0)
c  in CNF:
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_2
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_1
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨  b^{15, 63}_0
c  in DIMACS:
 12698  12699  12700 -930 -12701 0
 12698  12699  12700 -930 -12702 0
 12698  12699  12700 -930  12703 0

c  1+1 --> 2
c    (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0 ∧  p_930) -> (-b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0)
c  in CNF:
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_2
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨  b^{15, 63}_1
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ -p_930 ∨ -b^{15, 63}_0
c  in DIMACS:
 12698  12699 -12700 -930 -12701 0
 12698  12699 -12700 -930  12702 0
 12698  12699 -12700 -930 -12703 0

c  2+1 --> break 
c    (-b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧  p_930) -> break
c  in CNF:
c     b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 12698 -12699  12700 -930 1162 0


c  2-1 --> 1
c    (-b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧ -p_930) -> (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0)
c  in CNF:
c     b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_2
c     b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_1
c     b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨  b^{15, 63}_0
c  in DIMACS:
 12698 -12699  12700  930 -12701 0
 12698 -12699  12700  930 -12702 0
 12698 -12699  12700  930  12703 0

c  1-1 --> 0
c    (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0 ∧ -p_930) -> (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧ -b^{15, 63}_0)
c  in CNF:
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_2
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_1
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_0
c  in DIMACS:
 12698  12699 -12700  930 -12701 0
 12698  12699 -12700  930 -12702 0
 12698  12699 -12700  930 -12703 0

c  0-1 --> -1
c    (-b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧ -p_930) -> ( b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0)
c  in CNF:
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨  b^{15, 63}_2
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_1
c     b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨  b^{15, 63}_0
c  in DIMACS:
 12698  12699  12700  930  12701 0
 12698  12699  12700  930 -12702 0
 12698  12699  12700  930  12703 0

c  -1-1 --> -2
c    ( b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧  b^{15, 62}_0 ∧ -p_930) -> ( b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0)
c  in CNF:
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨  b^{15, 63}_2
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨  b^{15, 63}_1
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨  p_930 ∨ -b^{15, 63}_0
c  in DIMACS:
-12698  12699 -12700  930  12701 0
-12698  12699 -12700  930  12702 0
-12698  12699 -12700  930 -12703 0

c  -2-1 --> break 
c    ( b^{15, 62}_2 ∧  b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨  b^{15, 62}_0 ∨  p_930 ∨ break
c  in DIMACS:
-12698 -12699  12700  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 62}_2 ∧ -b^{15, 62}_1 ∧ -b^{15, 62}_0 ∧ true) 
c  in CNF:
c    -b^{15, 62}_2 ∨  b^{15, 62}_1 ∨  b^{15, 62}_0 ∨ false 
c  in DIMACS:
-12698  12699  12700  0

c  3 does not represent an automaton state.
c    -(-b^{15, 62}_2 ∧  b^{15, 62}_1 ∧  b^{15, 62}_0 ∧ true) 
c  in CNF:
c     b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ false 
c  in DIMACS:
 12698 -12699 -12700  0
c  -3 does not represent an automaton state.
c    -( b^{15, 62}_2 ∧  b^{15, 62}_1 ∧  b^{15, 62}_0 ∧ true) 
c  in CNF:
c    -b^{15, 62}_2 ∨ -b^{15, 62}_1 ∨ -b^{15, 62}_0 ∨ false 
c  in DIMACS:
-12698 -12699 -12700  0

c i = 63
c  -2+1 --> -1
c    ( b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧  p_945) -> ( b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0)
c  in CNF:
c    -b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨  b^{15, 64}_2
c    -b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_1
c    -b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨  b^{15, 64}_0
c  in DIMACS:
-12701 -12702  12703 -945  12704 0
-12701 -12702  12703 -945 -12705 0
-12701 -12702  12703 -945  12706 0

c  -1+1 --> 0
c    ( b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0 ∧  p_945) -> (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧ -b^{15, 64}_0)
c  in CNF:
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_2
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_1
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_0
c  in DIMACS:
-12701  12702 -12703 -945 -12704 0
-12701  12702 -12703 -945 -12705 0
-12701  12702 -12703 -945 -12706 0

c  0+1 --> 1
c    (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧  p_945) -> (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0)
c  in CNF:
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_2
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_1
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨  b^{15, 64}_0
c  in DIMACS:
 12701  12702  12703 -945 -12704 0
 12701  12702  12703 -945 -12705 0
 12701  12702  12703 -945  12706 0

c  1+1 --> 2
c    (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0 ∧  p_945) -> (-b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0)
c  in CNF:
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_2
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨  b^{15, 64}_1
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ -p_945 ∨ -b^{15, 64}_0
c  in DIMACS:
 12701  12702 -12703 -945 -12704 0
 12701  12702 -12703 -945  12705 0
 12701  12702 -12703 -945 -12706 0

c  2+1 --> break 
c    (-b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧  p_945) -> break
c  in CNF:
c     b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 12701 -12702  12703 -945 1162 0


c  2-1 --> 1
c    (-b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧ -p_945) -> (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0)
c  in CNF:
c     b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_2
c     b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_1
c     b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨  b^{15, 64}_0
c  in DIMACS:
 12701 -12702  12703  945 -12704 0
 12701 -12702  12703  945 -12705 0
 12701 -12702  12703  945  12706 0

c  1-1 --> 0
c    (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0 ∧ -p_945) -> (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧ -b^{15, 64}_0)
c  in CNF:
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_2
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_1
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_0
c  in DIMACS:
 12701  12702 -12703  945 -12704 0
 12701  12702 -12703  945 -12705 0
 12701  12702 -12703  945 -12706 0

c  0-1 --> -1
c    (-b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧ -p_945) -> ( b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0)
c  in CNF:
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨  b^{15, 64}_2
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_1
c     b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨  b^{15, 64}_0
c  in DIMACS:
 12701  12702  12703  945  12704 0
 12701  12702  12703  945 -12705 0
 12701  12702  12703  945  12706 0

c  -1-1 --> -2
c    ( b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧  b^{15, 63}_0 ∧ -p_945) -> ( b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0)
c  in CNF:
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨  b^{15, 64}_2
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨  b^{15, 64}_1
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨  p_945 ∨ -b^{15, 64}_0
c  in DIMACS:
-12701  12702 -12703  945  12704 0
-12701  12702 -12703  945  12705 0
-12701  12702 -12703  945 -12706 0

c  -2-1 --> break 
c    ( b^{15, 63}_2 ∧  b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨  b^{15, 63}_0 ∨  p_945 ∨ break
c  in DIMACS:
-12701 -12702  12703  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 63}_2 ∧ -b^{15, 63}_1 ∧ -b^{15, 63}_0 ∧ true) 
c  in CNF:
c    -b^{15, 63}_2 ∨  b^{15, 63}_1 ∨  b^{15, 63}_0 ∨ false 
c  in DIMACS:
-12701  12702  12703  0

c  3 does not represent an automaton state.
c    -(-b^{15, 63}_2 ∧  b^{15, 63}_1 ∧  b^{15, 63}_0 ∧ true) 
c  in CNF:
c     b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ false 
c  in DIMACS:
 12701 -12702 -12703  0
c  -3 does not represent an automaton state.
c    -( b^{15, 63}_2 ∧  b^{15, 63}_1 ∧  b^{15, 63}_0 ∧ true) 
c  in CNF:
c    -b^{15, 63}_2 ∨ -b^{15, 63}_1 ∨ -b^{15, 63}_0 ∨ false 
c  in DIMACS:
-12701 -12702 -12703  0

c i = 64
c  -2+1 --> -1
c    ( b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧  p_960) -> ( b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0)
c  in CNF:
c    -b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨  b^{15, 65}_2
c    -b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_1
c    -b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨  b^{15, 65}_0
c  in DIMACS:
-12704 -12705  12706 -960  12707 0
-12704 -12705  12706 -960 -12708 0
-12704 -12705  12706 -960  12709 0

c  -1+1 --> 0
c    ( b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0 ∧  p_960) -> (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧ -b^{15, 65}_0)
c  in CNF:
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_2
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_1
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_0
c  in DIMACS:
-12704  12705 -12706 -960 -12707 0
-12704  12705 -12706 -960 -12708 0
-12704  12705 -12706 -960 -12709 0

c  0+1 --> 1
c    (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧  p_960) -> (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0)
c  in CNF:
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_2
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_1
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨  b^{15, 65}_0
c  in DIMACS:
 12704  12705  12706 -960 -12707 0
 12704  12705  12706 -960 -12708 0
 12704  12705  12706 -960  12709 0

c  1+1 --> 2
c    (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0 ∧  p_960) -> (-b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0)
c  in CNF:
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_2
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨  b^{15, 65}_1
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ -p_960 ∨ -b^{15, 65}_0
c  in DIMACS:
 12704  12705 -12706 -960 -12707 0
 12704  12705 -12706 -960  12708 0
 12704  12705 -12706 -960 -12709 0

c  2+1 --> break 
c    (-b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧  p_960) -> break
c  in CNF:
c     b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 12704 -12705  12706 -960 1162 0


c  2-1 --> 1
c    (-b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧ -p_960) -> (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0)
c  in CNF:
c     b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_2
c     b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_1
c     b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨  b^{15, 65}_0
c  in DIMACS:
 12704 -12705  12706  960 -12707 0
 12704 -12705  12706  960 -12708 0
 12704 -12705  12706  960  12709 0

c  1-1 --> 0
c    (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0 ∧ -p_960) -> (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧ -b^{15, 65}_0)
c  in CNF:
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_2
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_1
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_0
c  in DIMACS:
 12704  12705 -12706  960 -12707 0
 12704  12705 -12706  960 -12708 0
 12704  12705 -12706  960 -12709 0

c  0-1 --> -1
c    (-b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧ -p_960) -> ( b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0)
c  in CNF:
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨  b^{15, 65}_2
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_1
c     b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨  b^{15, 65}_0
c  in DIMACS:
 12704  12705  12706  960  12707 0
 12704  12705  12706  960 -12708 0
 12704  12705  12706  960  12709 0

c  -1-1 --> -2
c    ( b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧  b^{15, 64}_0 ∧ -p_960) -> ( b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0)
c  in CNF:
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨  b^{15, 65}_2
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨  b^{15, 65}_1
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨  p_960 ∨ -b^{15, 65}_0
c  in DIMACS:
-12704  12705 -12706  960  12707 0
-12704  12705 -12706  960  12708 0
-12704  12705 -12706  960 -12709 0

c  -2-1 --> break 
c    ( b^{15, 64}_2 ∧  b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨  b^{15, 64}_0 ∨  p_960 ∨ break
c  in DIMACS:
-12704 -12705  12706  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 64}_2 ∧ -b^{15, 64}_1 ∧ -b^{15, 64}_0 ∧ true) 
c  in CNF:
c    -b^{15, 64}_2 ∨  b^{15, 64}_1 ∨  b^{15, 64}_0 ∨ false 
c  in DIMACS:
-12704  12705  12706  0

c  3 does not represent an automaton state.
c    -(-b^{15, 64}_2 ∧  b^{15, 64}_1 ∧  b^{15, 64}_0 ∧ true) 
c  in CNF:
c     b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ false 
c  in DIMACS:
 12704 -12705 -12706  0
c  -3 does not represent an automaton state.
c    -( b^{15, 64}_2 ∧  b^{15, 64}_1 ∧  b^{15, 64}_0 ∧ true) 
c  in CNF:
c    -b^{15, 64}_2 ∨ -b^{15, 64}_1 ∨ -b^{15, 64}_0 ∨ false 
c  in DIMACS:
-12704 -12705 -12706  0

c i = 65
c  -2+1 --> -1
c    ( b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧  p_975) -> ( b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0)
c  in CNF:
c    -b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨  b^{15, 66}_2
c    -b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_1
c    -b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨  b^{15, 66}_0
c  in DIMACS:
-12707 -12708  12709 -975  12710 0
-12707 -12708  12709 -975 -12711 0
-12707 -12708  12709 -975  12712 0

c  -1+1 --> 0
c    ( b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0 ∧  p_975) -> (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧ -b^{15, 66}_0)
c  in CNF:
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_2
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_1
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_0
c  in DIMACS:
-12707  12708 -12709 -975 -12710 0
-12707  12708 -12709 -975 -12711 0
-12707  12708 -12709 -975 -12712 0

c  0+1 --> 1
c    (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧  p_975) -> (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0)
c  in CNF:
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_2
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_1
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨  b^{15, 66}_0
c  in DIMACS:
 12707  12708  12709 -975 -12710 0
 12707  12708  12709 -975 -12711 0
 12707  12708  12709 -975  12712 0

c  1+1 --> 2
c    (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0 ∧  p_975) -> (-b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0)
c  in CNF:
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_2
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨  b^{15, 66}_1
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ -p_975 ∨ -b^{15, 66}_0
c  in DIMACS:
 12707  12708 -12709 -975 -12710 0
 12707  12708 -12709 -975  12711 0
 12707  12708 -12709 -975 -12712 0

c  2+1 --> break 
c    (-b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧  p_975) -> break
c  in CNF:
c     b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 12707 -12708  12709 -975 1162 0


c  2-1 --> 1
c    (-b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧ -p_975) -> (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0)
c  in CNF:
c     b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_2
c     b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_1
c     b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨  b^{15, 66}_0
c  in DIMACS:
 12707 -12708  12709  975 -12710 0
 12707 -12708  12709  975 -12711 0
 12707 -12708  12709  975  12712 0

c  1-1 --> 0
c    (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0 ∧ -p_975) -> (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧ -b^{15, 66}_0)
c  in CNF:
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_2
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_1
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_0
c  in DIMACS:
 12707  12708 -12709  975 -12710 0
 12707  12708 -12709  975 -12711 0
 12707  12708 -12709  975 -12712 0

c  0-1 --> -1
c    (-b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧ -p_975) -> ( b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0)
c  in CNF:
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨  b^{15, 66}_2
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_1
c     b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨  b^{15, 66}_0
c  in DIMACS:
 12707  12708  12709  975  12710 0
 12707  12708  12709  975 -12711 0
 12707  12708  12709  975  12712 0

c  -1-1 --> -2
c    ( b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧  b^{15, 65}_0 ∧ -p_975) -> ( b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0)
c  in CNF:
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨  b^{15, 66}_2
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨  b^{15, 66}_1
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨  p_975 ∨ -b^{15, 66}_0
c  in DIMACS:
-12707  12708 -12709  975  12710 0
-12707  12708 -12709  975  12711 0
-12707  12708 -12709  975 -12712 0

c  -2-1 --> break 
c    ( b^{15, 65}_2 ∧  b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨  b^{15, 65}_0 ∨  p_975 ∨ break
c  in DIMACS:
-12707 -12708  12709  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 65}_2 ∧ -b^{15, 65}_1 ∧ -b^{15, 65}_0 ∧ true) 
c  in CNF:
c    -b^{15, 65}_2 ∨  b^{15, 65}_1 ∨  b^{15, 65}_0 ∨ false 
c  in DIMACS:
-12707  12708  12709  0

c  3 does not represent an automaton state.
c    -(-b^{15, 65}_2 ∧  b^{15, 65}_1 ∧  b^{15, 65}_0 ∧ true) 
c  in CNF:
c     b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ false 
c  in DIMACS:
 12707 -12708 -12709  0
c  -3 does not represent an automaton state.
c    -( b^{15, 65}_2 ∧  b^{15, 65}_1 ∧  b^{15, 65}_0 ∧ true) 
c  in CNF:
c    -b^{15, 65}_2 ∨ -b^{15, 65}_1 ∨ -b^{15, 65}_0 ∨ false 
c  in DIMACS:
-12707 -12708 -12709  0

c i = 66
c  -2+1 --> -1
c    ( b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧  p_990) -> ( b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0)
c  in CNF:
c    -b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨  b^{15, 67}_2
c    -b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_1
c    -b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨  b^{15, 67}_0
c  in DIMACS:
-12710 -12711  12712 -990  12713 0
-12710 -12711  12712 -990 -12714 0
-12710 -12711  12712 -990  12715 0

c  -1+1 --> 0
c    ( b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0 ∧  p_990) -> (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧ -b^{15, 67}_0)
c  in CNF:
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_2
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_1
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_0
c  in DIMACS:
-12710  12711 -12712 -990 -12713 0
-12710  12711 -12712 -990 -12714 0
-12710  12711 -12712 -990 -12715 0

c  0+1 --> 1
c    (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧  p_990) -> (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0)
c  in CNF:
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_2
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_1
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨  b^{15, 67}_0
c  in DIMACS:
 12710  12711  12712 -990 -12713 0
 12710  12711  12712 -990 -12714 0
 12710  12711  12712 -990  12715 0

c  1+1 --> 2
c    (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0 ∧  p_990) -> (-b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0)
c  in CNF:
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_2
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨  b^{15, 67}_1
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ -p_990 ∨ -b^{15, 67}_0
c  in DIMACS:
 12710  12711 -12712 -990 -12713 0
 12710  12711 -12712 -990  12714 0
 12710  12711 -12712 -990 -12715 0

c  2+1 --> break 
c    (-b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧  p_990) -> break
c  in CNF:
c     b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 12710 -12711  12712 -990 1162 0


c  2-1 --> 1
c    (-b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧ -p_990) -> (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0)
c  in CNF:
c     b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_2
c     b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_1
c     b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨  b^{15, 67}_0
c  in DIMACS:
 12710 -12711  12712  990 -12713 0
 12710 -12711  12712  990 -12714 0
 12710 -12711  12712  990  12715 0

c  1-1 --> 0
c    (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0 ∧ -p_990) -> (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧ -b^{15, 67}_0)
c  in CNF:
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_2
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_1
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_0
c  in DIMACS:
 12710  12711 -12712  990 -12713 0
 12710  12711 -12712  990 -12714 0
 12710  12711 -12712  990 -12715 0

c  0-1 --> -1
c    (-b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧ -p_990) -> ( b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0)
c  in CNF:
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨  b^{15, 67}_2
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_1
c     b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨  b^{15, 67}_0
c  in DIMACS:
 12710  12711  12712  990  12713 0
 12710  12711  12712  990 -12714 0
 12710  12711  12712  990  12715 0

c  -1-1 --> -2
c    ( b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧  b^{15, 66}_0 ∧ -p_990) -> ( b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0)
c  in CNF:
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨  b^{15, 67}_2
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨  b^{15, 67}_1
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨  p_990 ∨ -b^{15, 67}_0
c  in DIMACS:
-12710  12711 -12712  990  12713 0
-12710  12711 -12712  990  12714 0
-12710  12711 -12712  990 -12715 0

c  -2-1 --> break 
c    ( b^{15, 66}_2 ∧  b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨  b^{15, 66}_0 ∨  p_990 ∨ break
c  in DIMACS:
-12710 -12711  12712  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 66}_2 ∧ -b^{15, 66}_1 ∧ -b^{15, 66}_0 ∧ true) 
c  in CNF:
c    -b^{15, 66}_2 ∨  b^{15, 66}_1 ∨  b^{15, 66}_0 ∨ false 
c  in DIMACS:
-12710  12711  12712  0

c  3 does not represent an automaton state.
c    -(-b^{15, 66}_2 ∧  b^{15, 66}_1 ∧  b^{15, 66}_0 ∧ true) 
c  in CNF:
c     b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ false 
c  in DIMACS:
 12710 -12711 -12712  0
c  -3 does not represent an automaton state.
c    -( b^{15, 66}_2 ∧  b^{15, 66}_1 ∧  b^{15, 66}_0 ∧ true) 
c  in CNF:
c    -b^{15, 66}_2 ∨ -b^{15, 66}_1 ∨ -b^{15, 66}_0 ∨ false 
c  in DIMACS:
-12710 -12711 -12712  0

c i = 67
c  -2+1 --> -1
c    ( b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧  p_1005) -> ( b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0)
c  in CNF:
c    -b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨  b^{15, 68}_2
c    -b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_1
c    -b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨  b^{15, 68}_0
c  in DIMACS:
-12713 -12714  12715 -1005  12716 0
-12713 -12714  12715 -1005 -12717 0
-12713 -12714  12715 -1005  12718 0

c  -1+1 --> 0
c    ( b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0 ∧  p_1005) -> (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧ -b^{15, 68}_0)
c  in CNF:
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_2
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_1
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_0
c  in DIMACS:
-12713  12714 -12715 -1005 -12716 0
-12713  12714 -12715 -1005 -12717 0
-12713  12714 -12715 -1005 -12718 0

c  0+1 --> 1
c    (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧  p_1005) -> (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0)
c  in CNF:
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_2
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_1
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨  b^{15, 68}_0
c  in DIMACS:
 12713  12714  12715 -1005 -12716 0
 12713  12714  12715 -1005 -12717 0
 12713  12714  12715 -1005  12718 0

c  1+1 --> 2
c    (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0 ∧  p_1005) -> (-b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0)
c  in CNF:
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_2
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨  b^{15, 68}_1
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ -p_1005 ∨ -b^{15, 68}_0
c  in DIMACS:
 12713  12714 -12715 -1005 -12716 0
 12713  12714 -12715 -1005  12717 0
 12713  12714 -12715 -1005 -12718 0

c  2+1 --> break 
c    (-b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 12713 -12714  12715 -1005 1162 0


c  2-1 --> 1
c    (-b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧ -p_1005) -> (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0)
c  in CNF:
c     b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_2
c     b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_1
c     b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨  b^{15, 68}_0
c  in DIMACS:
 12713 -12714  12715  1005 -12716 0
 12713 -12714  12715  1005 -12717 0
 12713 -12714  12715  1005  12718 0

c  1-1 --> 0
c    (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0 ∧ -p_1005) -> (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧ -b^{15, 68}_0)
c  in CNF:
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_2
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_1
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_0
c  in DIMACS:
 12713  12714 -12715  1005 -12716 0
 12713  12714 -12715  1005 -12717 0
 12713  12714 -12715  1005 -12718 0

c  0-1 --> -1
c    (-b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧ -p_1005) -> ( b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0)
c  in CNF:
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨  b^{15, 68}_2
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_1
c     b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨  b^{15, 68}_0
c  in DIMACS:
 12713  12714  12715  1005  12716 0
 12713  12714  12715  1005 -12717 0
 12713  12714  12715  1005  12718 0

c  -1-1 --> -2
c    ( b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧  b^{15, 67}_0 ∧ -p_1005) -> ( b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0)
c  in CNF:
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨  b^{15, 68}_2
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨  b^{15, 68}_1
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨  p_1005 ∨ -b^{15, 68}_0
c  in DIMACS:
-12713  12714 -12715  1005  12716 0
-12713  12714 -12715  1005  12717 0
-12713  12714 -12715  1005 -12718 0

c  -2-1 --> break 
c    ( b^{15, 67}_2 ∧  b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨  b^{15, 67}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-12713 -12714  12715  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 67}_2 ∧ -b^{15, 67}_1 ∧ -b^{15, 67}_0 ∧ true) 
c  in CNF:
c    -b^{15, 67}_2 ∨  b^{15, 67}_1 ∨  b^{15, 67}_0 ∨ false 
c  in DIMACS:
-12713  12714  12715  0

c  3 does not represent an automaton state.
c    -(-b^{15, 67}_2 ∧  b^{15, 67}_1 ∧  b^{15, 67}_0 ∧ true) 
c  in CNF:
c     b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ false 
c  in DIMACS:
 12713 -12714 -12715  0
c  -3 does not represent an automaton state.
c    -( b^{15, 67}_2 ∧  b^{15, 67}_1 ∧  b^{15, 67}_0 ∧ true) 
c  in CNF:
c    -b^{15, 67}_2 ∨ -b^{15, 67}_1 ∨ -b^{15, 67}_0 ∨ false 
c  in DIMACS:
-12713 -12714 -12715  0

c i = 68
c  -2+1 --> -1
c    ( b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧  p_1020) -> ( b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0)
c  in CNF:
c    -b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨  b^{15, 69}_2
c    -b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_1
c    -b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨  b^{15, 69}_0
c  in DIMACS:
-12716 -12717  12718 -1020  12719 0
-12716 -12717  12718 -1020 -12720 0
-12716 -12717  12718 -1020  12721 0

c  -1+1 --> 0
c    ( b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0 ∧  p_1020) -> (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧ -b^{15, 69}_0)
c  in CNF:
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_2
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_1
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_0
c  in DIMACS:
-12716  12717 -12718 -1020 -12719 0
-12716  12717 -12718 -1020 -12720 0
-12716  12717 -12718 -1020 -12721 0

c  0+1 --> 1
c    (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧  p_1020) -> (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0)
c  in CNF:
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_2
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_1
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨  b^{15, 69}_0
c  in DIMACS:
 12716  12717  12718 -1020 -12719 0
 12716  12717  12718 -1020 -12720 0
 12716  12717  12718 -1020  12721 0

c  1+1 --> 2
c    (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0 ∧  p_1020) -> (-b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0)
c  in CNF:
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_2
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨  b^{15, 69}_1
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ -p_1020 ∨ -b^{15, 69}_0
c  in DIMACS:
 12716  12717 -12718 -1020 -12719 0
 12716  12717 -12718 -1020  12720 0
 12716  12717 -12718 -1020 -12721 0

c  2+1 --> break 
c    (-b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 12716 -12717  12718 -1020 1162 0


c  2-1 --> 1
c    (-b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧ -p_1020) -> (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0)
c  in CNF:
c     b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_2
c     b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_1
c     b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨  b^{15, 69}_0
c  in DIMACS:
 12716 -12717  12718  1020 -12719 0
 12716 -12717  12718  1020 -12720 0
 12716 -12717  12718  1020  12721 0

c  1-1 --> 0
c    (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0 ∧ -p_1020) -> (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧ -b^{15, 69}_0)
c  in CNF:
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_2
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_1
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_0
c  in DIMACS:
 12716  12717 -12718  1020 -12719 0
 12716  12717 -12718  1020 -12720 0
 12716  12717 -12718  1020 -12721 0

c  0-1 --> -1
c    (-b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧ -p_1020) -> ( b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0)
c  in CNF:
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨  b^{15, 69}_2
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_1
c     b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨  b^{15, 69}_0
c  in DIMACS:
 12716  12717  12718  1020  12719 0
 12716  12717  12718  1020 -12720 0
 12716  12717  12718  1020  12721 0

c  -1-1 --> -2
c    ( b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧  b^{15, 68}_0 ∧ -p_1020) -> ( b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0)
c  in CNF:
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨  b^{15, 69}_2
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨  b^{15, 69}_1
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨  p_1020 ∨ -b^{15, 69}_0
c  in DIMACS:
-12716  12717 -12718  1020  12719 0
-12716  12717 -12718  1020  12720 0
-12716  12717 -12718  1020 -12721 0

c  -2-1 --> break 
c    ( b^{15, 68}_2 ∧  b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨  b^{15, 68}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-12716 -12717  12718  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 68}_2 ∧ -b^{15, 68}_1 ∧ -b^{15, 68}_0 ∧ true) 
c  in CNF:
c    -b^{15, 68}_2 ∨  b^{15, 68}_1 ∨  b^{15, 68}_0 ∨ false 
c  in DIMACS:
-12716  12717  12718  0

c  3 does not represent an automaton state.
c    -(-b^{15, 68}_2 ∧  b^{15, 68}_1 ∧  b^{15, 68}_0 ∧ true) 
c  in CNF:
c     b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ false 
c  in DIMACS:
 12716 -12717 -12718  0
c  -3 does not represent an automaton state.
c    -( b^{15, 68}_2 ∧  b^{15, 68}_1 ∧  b^{15, 68}_0 ∧ true) 
c  in CNF:
c    -b^{15, 68}_2 ∨ -b^{15, 68}_1 ∨ -b^{15, 68}_0 ∨ false 
c  in DIMACS:
-12716 -12717 -12718  0

c i = 69
c  -2+1 --> -1
c    ( b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧  p_1035) -> ( b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0)
c  in CNF:
c    -b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨  b^{15, 70}_2
c    -b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_1
c    -b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨  b^{15, 70}_0
c  in DIMACS:
-12719 -12720  12721 -1035  12722 0
-12719 -12720  12721 -1035 -12723 0
-12719 -12720  12721 -1035  12724 0

c  -1+1 --> 0
c    ( b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0 ∧  p_1035) -> (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧ -b^{15, 70}_0)
c  in CNF:
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_2
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_1
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_0
c  in DIMACS:
-12719  12720 -12721 -1035 -12722 0
-12719  12720 -12721 -1035 -12723 0
-12719  12720 -12721 -1035 -12724 0

c  0+1 --> 1
c    (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧  p_1035) -> (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0)
c  in CNF:
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_2
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_1
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨  b^{15, 70}_0
c  in DIMACS:
 12719  12720  12721 -1035 -12722 0
 12719  12720  12721 -1035 -12723 0
 12719  12720  12721 -1035  12724 0

c  1+1 --> 2
c    (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0 ∧  p_1035) -> (-b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0)
c  in CNF:
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_2
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨  b^{15, 70}_1
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ -p_1035 ∨ -b^{15, 70}_0
c  in DIMACS:
 12719  12720 -12721 -1035 -12722 0
 12719  12720 -12721 -1035  12723 0
 12719  12720 -12721 -1035 -12724 0

c  2+1 --> break 
c    (-b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 12719 -12720  12721 -1035 1162 0


c  2-1 --> 1
c    (-b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧ -p_1035) -> (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0)
c  in CNF:
c     b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_2
c     b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_1
c     b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨  b^{15, 70}_0
c  in DIMACS:
 12719 -12720  12721  1035 -12722 0
 12719 -12720  12721  1035 -12723 0
 12719 -12720  12721  1035  12724 0

c  1-1 --> 0
c    (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0 ∧ -p_1035) -> (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧ -b^{15, 70}_0)
c  in CNF:
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_2
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_1
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_0
c  in DIMACS:
 12719  12720 -12721  1035 -12722 0
 12719  12720 -12721  1035 -12723 0
 12719  12720 -12721  1035 -12724 0

c  0-1 --> -1
c    (-b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧ -p_1035) -> ( b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0)
c  in CNF:
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨  b^{15, 70}_2
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_1
c     b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨  b^{15, 70}_0
c  in DIMACS:
 12719  12720  12721  1035  12722 0
 12719  12720  12721  1035 -12723 0
 12719  12720  12721  1035  12724 0

c  -1-1 --> -2
c    ( b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧  b^{15, 69}_0 ∧ -p_1035) -> ( b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0)
c  in CNF:
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨  b^{15, 70}_2
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨  b^{15, 70}_1
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨  p_1035 ∨ -b^{15, 70}_0
c  in DIMACS:
-12719  12720 -12721  1035  12722 0
-12719  12720 -12721  1035  12723 0
-12719  12720 -12721  1035 -12724 0

c  -2-1 --> break 
c    ( b^{15, 69}_2 ∧  b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨  b^{15, 69}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-12719 -12720  12721  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 69}_2 ∧ -b^{15, 69}_1 ∧ -b^{15, 69}_0 ∧ true) 
c  in CNF:
c    -b^{15, 69}_2 ∨  b^{15, 69}_1 ∨  b^{15, 69}_0 ∨ false 
c  in DIMACS:
-12719  12720  12721  0

c  3 does not represent an automaton state.
c    -(-b^{15, 69}_2 ∧  b^{15, 69}_1 ∧  b^{15, 69}_0 ∧ true) 
c  in CNF:
c     b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ false 
c  in DIMACS:
 12719 -12720 -12721  0
c  -3 does not represent an automaton state.
c    -( b^{15, 69}_2 ∧  b^{15, 69}_1 ∧  b^{15, 69}_0 ∧ true) 
c  in CNF:
c    -b^{15, 69}_2 ∨ -b^{15, 69}_1 ∨ -b^{15, 69}_0 ∨ false 
c  in DIMACS:
-12719 -12720 -12721  0

c i = 70
c  -2+1 --> -1
c    ( b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧  p_1050) -> ( b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0)
c  in CNF:
c    -b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨  b^{15, 71}_2
c    -b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_1
c    -b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨  b^{15, 71}_0
c  in DIMACS:
-12722 -12723  12724 -1050  12725 0
-12722 -12723  12724 -1050 -12726 0
-12722 -12723  12724 -1050  12727 0

c  -1+1 --> 0
c    ( b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0 ∧  p_1050) -> (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧ -b^{15, 71}_0)
c  in CNF:
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_2
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_1
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_0
c  in DIMACS:
-12722  12723 -12724 -1050 -12725 0
-12722  12723 -12724 -1050 -12726 0
-12722  12723 -12724 -1050 -12727 0

c  0+1 --> 1
c    (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧  p_1050) -> (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0)
c  in CNF:
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_2
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_1
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨  b^{15, 71}_0
c  in DIMACS:
 12722  12723  12724 -1050 -12725 0
 12722  12723  12724 -1050 -12726 0
 12722  12723  12724 -1050  12727 0

c  1+1 --> 2
c    (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0 ∧  p_1050) -> (-b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0)
c  in CNF:
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_2
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨  b^{15, 71}_1
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ -p_1050 ∨ -b^{15, 71}_0
c  in DIMACS:
 12722  12723 -12724 -1050 -12725 0
 12722  12723 -12724 -1050  12726 0
 12722  12723 -12724 -1050 -12727 0

c  2+1 --> break 
c    (-b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 12722 -12723  12724 -1050 1162 0


c  2-1 --> 1
c    (-b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧ -p_1050) -> (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0)
c  in CNF:
c     b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_2
c     b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_1
c     b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨  b^{15, 71}_0
c  in DIMACS:
 12722 -12723  12724  1050 -12725 0
 12722 -12723  12724  1050 -12726 0
 12722 -12723  12724  1050  12727 0

c  1-1 --> 0
c    (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0 ∧ -p_1050) -> (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧ -b^{15, 71}_0)
c  in CNF:
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_2
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_1
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_0
c  in DIMACS:
 12722  12723 -12724  1050 -12725 0
 12722  12723 -12724  1050 -12726 0
 12722  12723 -12724  1050 -12727 0

c  0-1 --> -1
c    (-b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧ -p_1050) -> ( b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0)
c  in CNF:
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨  b^{15, 71}_2
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_1
c     b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨  b^{15, 71}_0
c  in DIMACS:
 12722  12723  12724  1050  12725 0
 12722  12723  12724  1050 -12726 0
 12722  12723  12724  1050  12727 0

c  -1-1 --> -2
c    ( b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧  b^{15, 70}_0 ∧ -p_1050) -> ( b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0)
c  in CNF:
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨  b^{15, 71}_2
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨  b^{15, 71}_1
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨  p_1050 ∨ -b^{15, 71}_0
c  in DIMACS:
-12722  12723 -12724  1050  12725 0
-12722  12723 -12724  1050  12726 0
-12722  12723 -12724  1050 -12727 0

c  -2-1 --> break 
c    ( b^{15, 70}_2 ∧  b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨  b^{15, 70}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-12722 -12723  12724  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 70}_2 ∧ -b^{15, 70}_1 ∧ -b^{15, 70}_0 ∧ true) 
c  in CNF:
c    -b^{15, 70}_2 ∨  b^{15, 70}_1 ∨  b^{15, 70}_0 ∨ false 
c  in DIMACS:
-12722  12723  12724  0

c  3 does not represent an automaton state.
c    -(-b^{15, 70}_2 ∧  b^{15, 70}_1 ∧  b^{15, 70}_0 ∧ true) 
c  in CNF:
c     b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ false 
c  in DIMACS:
 12722 -12723 -12724  0
c  -3 does not represent an automaton state.
c    -( b^{15, 70}_2 ∧  b^{15, 70}_1 ∧  b^{15, 70}_0 ∧ true) 
c  in CNF:
c    -b^{15, 70}_2 ∨ -b^{15, 70}_1 ∨ -b^{15, 70}_0 ∨ false 
c  in DIMACS:
-12722 -12723 -12724  0

c i = 71
c  -2+1 --> -1
c    ( b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧  p_1065) -> ( b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0)
c  in CNF:
c    -b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨  b^{15, 72}_2
c    -b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_1
c    -b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨  b^{15, 72}_0
c  in DIMACS:
-12725 -12726  12727 -1065  12728 0
-12725 -12726  12727 -1065 -12729 0
-12725 -12726  12727 -1065  12730 0

c  -1+1 --> 0
c    ( b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0 ∧  p_1065) -> (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧ -b^{15, 72}_0)
c  in CNF:
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_2
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_1
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_0
c  in DIMACS:
-12725  12726 -12727 -1065 -12728 0
-12725  12726 -12727 -1065 -12729 0
-12725  12726 -12727 -1065 -12730 0

c  0+1 --> 1
c    (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧  p_1065) -> (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0)
c  in CNF:
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_2
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_1
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨  b^{15, 72}_0
c  in DIMACS:
 12725  12726  12727 -1065 -12728 0
 12725  12726  12727 -1065 -12729 0
 12725  12726  12727 -1065  12730 0

c  1+1 --> 2
c    (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0 ∧  p_1065) -> (-b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0)
c  in CNF:
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_2
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨  b^{15, 72}_1
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ -p_1065 ∨ -b^{15, 72}_0
c  in DIMACS:
 12725  12726 -12727 -1065 -12728 0
 12725  12726 -12727 -1065  12729 0
 12725  12726 -12727 -1065 -12730 0

c  2+1 --> break 
c    (-b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 12725 -12726  12727 -1065 1162 0


c  2-1 --> 1
c    (-b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧ -p_1065) -> (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0)
c  in CNF:
c     b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_2
c     b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_1
c     b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨  b^{15, 72}_0
c  in DIMACS:
 12725 -12726  12727  1065 -12728 0
 12725 -12726  12727  1065 -12729 0
 12725 -12726  12727  1065  12730 0

c  1-1 --> 0
c    (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0 ∧ -p_1065) -> (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧ -b^{15, 72}_0)
c  in CNF:
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_2
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_1
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_0
c  in DIMACS:
 12725  12726 -12727  1065 -12728 0
 12725  12726 -12727  1065 -12729 0
 12725  12726 -12727  1065 -12730 0

c  0-1 --> -1
c    (-b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧ -p_1065) -> ( b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0)
c  in CNF:
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨  b^{15, 72}_2
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_1
c     b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨  b^{15, 72}_0
c  in DIMACS:
 12725  12726  12727  1065  12728 0
 12725  12726  12727  1065 -12729 0
 12725  12726  12727  1065  12730 0

c  -1-1 --> -2
c    ( b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧  b^{15, 71}_0 ∧ -p_1065) -> ( b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0)
c  in CNF:
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨  b^{15, 72}_2
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨  b^{15, 72}_1
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨  p_1065 ∨ -b^{15, 72}_0
c  in DIMACS:
-12725  12726 -12727  1065  12728 0
-12725  12726 -12727  1065  12729 0
-12725  12726 -12727  1065 -12730 0

c  -2-1 --> break 
c    ( b^{15, 71}_2 ∧  b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨  b^{15, 71}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-12725 -12726  12727  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 71}_2 ∧ -b^{15, 71}_1 ∧ -b^{15, 71}_0 ∧ true) 
c  in CNF:
c    -b^{15, 71}_2 ∨  b^{15, 71}_1 ∨  b^{15, 71}_0 ∨ false 
c  in DIMACS:
-12725  12726  12727  0

c  3 does not represent an automaton state.
c    -(-b^{15, 71}_2 ∧  b^{15, 71}_1 ∧  b^{15, 71}_0 ∧ true) 
c  in CNF:
c     b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ false 
c  in DIMACS:
 12725 -12726 -12727  0
c  -3 does not represent an automaton state.
c    -( b^{15, 71}_2 ∧  b^{15, 71}_1 ∧  b^{15, 71}_0 ∧ true) 
c  in CNF:
c    -b^{15, 71}_2 ∨ -b^{15, 71}_1 ∨ -b^{15, 71}_0 ∨ false 
c  in DIMACS:
-12725 -12726 -12727  0

c i = 72
c  -2+1 --> -1
c    ( b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧  p_1080) -> ( b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0)
c  in CNF:
c    -b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨  b^{15, 73}_2
c    -b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_1
c    -b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨  b^{15, 73}_0
c  in DIMACS:
-12728 -12729  12730 -1080  12731 0
-12728 -12729  12730 -1080 -12732 0
-12728 -12729  12730 -1080  12733 0

c  -1+1 --> 0
c    ( b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0 ∧  p_1080) -> (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧ -b^{15, 73}_0)
c  in CNF:
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_2
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_1
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_0
c  in DIMACS:
-12728  12729 -12730 -1080 -12731 0
-12728  12729 -12730 -1080 -12732 0
-12728  12729 -12730 -1080 -12733 0

c  0+1 --> 1
c    (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧  p_1080) -> (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0)
c  in CNF:
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_2
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_1
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨  b^{15, 73}_0
c  in DIMACS:
 12728  12729  12730 -1080 -12731 0
 12728  12729  12730 -1080 -12732 0
 12728  12729  12730 -1080  12733 0

c  1+1 --> 2
c    (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0 ∧  p_1080) -> (-b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0)
c  in CNF:
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_2
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨  b^{15, 73}_1
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ -p_1080 ∨ -b^{15, 73}_0
c  in DIMACS:
 12728  12729 -12730 -1080 -12731 0
 12728  12729 -12730 -1080  12732 0
 12728  12729 -12730 -1080 -12733 0

c  2+1 --> break 
c    (-b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 12728 -12729  12730 -1080 1162 0


c  2-1 --> 1
c    (-b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧ -p_1080) -> (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0)
c  in CNF:
c     b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_2
c     b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_1
c     b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨  b^{15, 73}_0
c  in DIMACS:
 12728 -12729  12730  1080 -12731 0
 12728 -12729  12730  1080 -12732 0
 12728 -12729  12730  1080  12733 0

c  1-1 --> 0
c    (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0 ∧ -p_1080) -> (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧ -b^{15, 73}_0)
c  in CNF:
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_2
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_1
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_0
c  in DIMACS:
 12728  12729 -12730  1080 -12731 0
 12728  12729 -12730  1080 -12732 0
 12728  12729 -12730  1080 -12733 0

c  0-1 --> -1
c    (-b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧ -p_1080) -> ( b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0)
c  in CNF:
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨  b^{15, 73}_2
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_1
c     b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨  b^{15, 73}_0
c  in DIMACS:
 12728  12729  12730  1080  12731 0
 12728  12729  12730  1080 -12732 0
 12728  12729  12730  1080  12733 0

c  -1-1 --> -2
c    ( b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧  b^{15, 72}_0 ∧ -p_1080) -> ( b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0)
c  in CNF:
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨  b^{15, 73}_2
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨  b^{15, 73}_1
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨  p_1080 ∨ -b^{15, 73}_0
c  in DIMACS:
-12728  12729 -12730  1080  12731 0
-12728  12729 -12730  1080  12732 0
-12728  12729 -12730  1080 -12733 0

c  -2-1 --> break 
c    ( b^{15, 72}_2 ∧  b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨  b^{15, 72}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-12728 -12729  12730  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 72}_2 ∧ -b^{15, 72}_1 ∧ -b^{15, 72}_0 ∧ true) 
c  in CNF:
c    -b^{15, 72}_2 ∨  b^{15, 72}_1 ∨  b^{15, 72}_0 ∨ false 
c  in DIMACS:
-12728  12729  12730  0

c  3 does not represent an automaton state.
c    -(-b^{15, 72}_2 ∧  b^{15, 72}_1 ∧  b^{15, 72}_0 ∧ true) 
c  in CNF:
c     b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ false 
c  in DIMACS:
 12728 -12729 -12730  0
c  -3 does not represent an automaton state.
c    -( b^{15, 72}_2 ∧  b^{15, 72}_1 ∧  b^{15, 72}_0 ∧ true) 
c  in CNF:
c    -b^{15, 72}_2 ∨ -b^{15, 72}_1 ∨ -b^{15, 72}_0 ∨ false 
c  in DIMACS:
-12728 -12729 -12730  0

c i = 73
c  -2+1 --> -1
c    ( b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧  p_1095) -> ( b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0)
c  in CNF:
c    -b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨  b^{15, 74}_2
c    -b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_1
c    -b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨  b^{15, 74}_0
c  in DIMACS:
-12731 -12732  12733 -1095  12734 0
-12731 -12732  12733 -1095 -12735 0
-12731 -12732  12733 -1095  12736 0

c  -1+1 --> 0
c    ( b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0 ∧  p_1095) -> (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧ -b^{15, 74}_0)
c  in CNF:
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_2
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_1
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_0
c  in DIMACS:
-12731  12732 -12733 -1095 -12734 0
-12731  12732 -12733 -1095 -12735 0
-12731  12732 -12733 -1095 -12736 0

c  0+1 --> 1
c    (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧  p_1095) -> (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0)
c  in CNF:
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_2
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_1
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨  b^{15, 74}_0
c  in DIMACS:
 12731  12732  12733 -1095 -12734 0
 12731  12732  12733 -1095 -12735 0
 12731  12732  12733 -1095  12736 0

c  1+1 --> 2
c    (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0 ∧  p_1095) -> (-b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0)
c  in CNF:
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_2
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨  b^{15, 74}_1
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ -p_1095 ∨ -b^{15, 74}_0
c  in DIMACS:
 12731  12732 -12733 -1095 -12734 0
 12731  12732 -12733 -1095  12735 0
 12731  12732 -12733 -1095 -12736 0

c  2+1 --> break 
c    (-b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 12731 -12732  12733 -1095 1162 0


c  2-1 --> 1
c    (-b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧ -p_1095) -> (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0)
c  in CNF:
c     b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_2
c     b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_1
c     b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨  b^{15, 74}_0
c  in DIMACS:
 12731 -12732  12733  1095 -12734 0
 12731 -12732  12733  1095 -12735 0
 12731 -12732  12733  1095  12736 0

c  1-1 --> 0
c    (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0 ∧ -p_1095) -> (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧ -b^{15, 74}_0)
c  in CNF:
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_2
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_1
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_0
c  in DIMACS:
 12731  12732 -12733  1095 -12734 0
 12731  12732 -12733  1095 -12735 0
 12731  12732 -12733  1095 -12736 0

c  0-1 --> -1
c    (-b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧ -p_1095) -> ( b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0)
c  in CNF:
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨  b^{15, 74}_2
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_1
c     b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨  b^{15, 74}_0
c  in DIMACS:
 12731  12732  12733  1095  12734 0
 12731  12732  12733  1095 -12735 0
 12731  12732  12733  1095  12736 0

c  -1-1 --> -2
c    ( b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧  b^{15, 73}_0 ∧ -p_1095) -> ( b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0)
c  in CNF:
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨  b^{15, 74}_2
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨  b^{15, 74}_1
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨  p_1095 ∨ -b^{15, 74}_0
c  in DIMACS:
-12731  12732 -12733  1095  12734 0
-12731  12732 -12733  1095  12735 0
-12731  12732 -12733  1095 -12736 0

c  -2-1 --> break 
c    ( b^{15, 73}_2 ∧  b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨  b^{15, 73}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-12731 -12732  12733  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 73}_2 ∧ -b^{15, 73}_1 ∧ -b^{15, 73}_0 ∧ true) 
c  in CNF:
c    -b^{15, 73}_2 ∨  b^{15, 73}_1 ∨  b^{15, 73}_0 ∨ false 
c  in DIMACS:
-12731  12732  12733  0

c  3 does not represent an automaton state.
c    -(-b^{15, 73}_2 ∧  b^{15, 73}_1 ∧  b^{15, 73}_0 ∧ true) 
c  in CNF:
c     b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ false 
c  in DIMACS:
 12731 -12732 -12733  0
c  -3 does not represent an automaton state.
c    -( b^{15, 73}_2 ∧  b^{15, 73}_1 ∧  b^{15, 73}_0 ∧ true) 
c  in CNF:
c    -b^{15, 73}_2 ∨ -b^{15, 73}_1 ∨ -b^{15, 73}_0 ∨ false 
c  in DIMACS:
-12731 -12732 -12733  0

c i = 74
c  -2+1 --> -1
c    ( b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧  p_1110) -> ( b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0)
c  in CNF:
c    -b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨  b^{15, 75}_2
c    -b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_1
c    -b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨  b^{15, 75}_0
c  in DIMACS:
-12734 -12735  12736 -1110  12737 0
-12734 -12735  12736 -1110 -12738 0
-12734 -12735  12736 -1110  12739 0

c  -1+1 --> 0
c    ( b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0 ∧  p_1110) -> (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧ -b^{15, 75}_0)
c  in CNF:
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_2
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_1
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_0
c  in DIMACS:
-12734  12735 -12736 -1110 -12737 0
-12734  12735 -12736 -1110 -12738 0
-12734  12735 -12736 -1110 -12739 0

c  0+1 --> 1
c    (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧  p_1110) -> (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0)
c  in CNF:
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_2
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_1
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨  b^{15, 75}_0
c  in DIMACS:
 12734  12735  12736 -1110 -12737 0
 12734  12735  12736 -1110 -12738 0
 12734  12735  12736 -1110  12739 0

c  1+1 --> 2
c    (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0 ∧  p_1110) -> (-b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0)
c  in CNF:
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_2
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨  b^{15, 75}_1
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ -p_1110 ∨ -b^{15, 75}_0
c  in DIMACS:
 12734  12735 -12736 -1110 -12737 0
 12734  12735 -12736 -1110  12738 0
 12734  12735 -12736 -1110 -12739 0

c  2+1 --> break 
c    (-b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 12734 -12735  12736 -1110 1162 0


c  2-1 --> 1
c    (-b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧ -p_1110) -> (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0)
c  in CNF:
c     b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_2
c     b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_1
c     b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨  b^{15, 75}_0
c  in DIMACS:
 12734 -12735  12736  1110 -12737 0
 12734 -12735  12736  1110 -12738 0
 12734 -12735  12736  1110  12739 0

c  1-1 --> 0
c    (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0 ∧ -p_1110) -> (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧ -b^{15, 75}_0)
c  in CNF:
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_2
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_1
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_0
c  in DIMACS:
 12734  12735 -12736  1110 -12737 0
 12734  12735 -12736  1110 -12738 0
 12734  12735 -12736  1110 -12739 0

c  0-1 --> -1
c    (-b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧ -p_1110) -> ( b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0)
c  in CNF:
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨  b^{15, 75}_2
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_1
c     b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨  b^{15, 75}_0
c  in DIMACS:
 12734  12735  12736  1110  12737 0
 12734  12735  12736  1110 -12738 0
 12734  12735  12736  1110  12739 0

c  -1-1 --> -2
c    ( b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧  b^{15, 74}_0 ∧ -p_1110) -> ( b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0)
c  in CNF:
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨  b^{15, 75}_2
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨  b^{15, 75}_1
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨  p_1110 ∨ -b^{15, 75}_0
c  in DIMACS:
-12734  12735 -12736  1110  12737 0
-12734  12735 -12736  1110  12738 0
-12734  12735 -12736  1110 -12739 0

c  -2-1 --> break 
c    ( b^{15, 74}_2 ∧  b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨  b^{15, 74}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-12734 -12735  12736  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 74}_2 ∧ -b^{15, 74}_1 ∧ -b^{15, 74}_0 ∧ true) 
c  in CNF:
c    -b^{15, 74}_2 ∨  b^{15, 74}_1 ∨  b^{15, 74}_0 ∨ false 
c  in DIMACS:
-12734  12735  12736  0

c  3 does not represent an automaton state.
c    -(-b^{15, 74}_2 ∧  b^{15, 74}_1 ∧  b^{15, 74}_0 ∧ true) 
c  in CNF:
c     b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ false 
c  in DIMACS:
 12734 -12735 -12736  0
c  -3 does not represent an automaton state.
c    -( b^{15, 74}_2 ∧  b^{15, 74}_1 ∧  b^{15, 74}_0 ∧ true) 
c  in CNF:
c    -b^{15, 74}_2 ∨ -b^{15, 74}_1 ∨ -b^{15, 74}_0 ∨ false 
c  in DIMACS:
-12734 -12735 -12736  0

c i = 75
c  -2+1 --> -1
c    ( b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧  p_1125) -> ( b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0)
c  in CNF:
c    -b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨  b^{15, 76}_2
c    -b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_1
c    -b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨  b^{15, 76}_0
c  in DIMACS:
-12737 -12738  12739 -1125  12740 0
-12737 -12738  12739 -1125 -12741 0
-12737 -12738  12739 -1125  12742 0

c  -1+1 --> 0
c    ( b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0 ∧  p_1125) -> (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧ -b^{15, 76}_0)
c  in CNF:
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_2
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_1
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_0
c  in DIMACS:
-12737  12738 -12739 -1125 -12740 0
-12737  12738 -12739 -1125 -12741 0
-12737  12738 -12739 -1125 -12742 0

c  0+1 --> 1
c    (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧  p_1125) -> (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0)
c  in CNF:
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_2
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_1
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨  b^{15, 76}_0
c  in DIMACS:
 12737  12738  12739 -1125 -12740 0
 12737  12738  12739 -1125 -12741 0
 12737  12738  12739 -1125  12742 0

c  1+1 --> 2
c    (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0 ∧  p_1125) -> (-b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0)
c  in CNF:
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_2
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨  b^{15, 76}_1
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ -p_1125 ∨ -b^{15, 76}_0
c  in DIMACS:
 12737  12738 -12739 -1125 -12740 0
 12737  12738 -12739 -1125  12741 0
 12737  12738 -12739 -1125 -12742 0

c  2+1 --> break 
c    (-b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 12737 -12738  12739 -1125 1162 0


c  2-1 --> 1
c    (-b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧ -p_1125) -> (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0)
c  in CNF:
c     b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_2
c     b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_1
c     b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨  b^{15, 76}_0
c  in DIMACS:
 12737 -12738  12739  1125 -12740 0
 12737 -12738  12739  1125 -12741 0
 12737 -12738  12739  1125  12742 0

c  1-1 --> 0
c    (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0 ∧ -p_1125) -> (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧ -b^{15, 76}_0)
c  in CNF:
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_2
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_1
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_0
c  in DIMACS:
 12737  12738 -12739  1125 -12740 0
 12737  12738 -12739  1125 -12741 0
 12737  12738 -12739  1125 -12742 0

c  0-1 --> -1
c    (-b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧ -p_1125) -> ( b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0)
c  in CNF:
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨  b^{15, 76}_2
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_1
c     b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨  b^{15, 76}_0
c  in DIMACS:
 12737  12738  12739  1125  12740 0
 12737  12738  12739  1125 -12741 0
 12737  12738  12739  1125  12742 0

c  -1-1 --> -2
c    ( b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧  b^{15, 75}_0 ∧ -p_1125) -> ( b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0)
c  in CNF:
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨  b^{15, 76}_2
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨  b^{15, 76}_1
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨  p_1125 ∨ -b^{15, 76}_0
c  in DIMACS:
-12737  12738 -12739  1125  12740 0
-12737  12738 -12739  1125  12741 0
-12737  12738 -12739  1125 -12742 0

c  -2-1 --> break 
c    ( b^{15, 75}_2 ∧  b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨  b^{15, 75}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-12737 -12738  12739  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 75}_2 ∧ -b^{15, 75}_1 ∧ -b^{15, 75}_0 ∧ true) 
c  in CNF:
c    -b^{15, 75}_2 ∨  b^{15, 75}_1 ∨  b^{15, 75}_0 ∨ false 
c  in DIMACS:
-12737  12738  12739  0

c  3 does not represent an automaton state.
c    -(-b^{15, 75}_2 ∧  b^{15, 75}_1 ∧  b^{15, 75}_0 ∧ true) 
c  in CNF:
c     b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ false 
c  in DIMACS:
 12737 -12738 -12739  0
c  -3 does not represent an automaton state.
c    -( b^{15, 75}_2 ∧  b^{15, 75}_1 ∧  b^{15, 75}_0 ∧ true) 
c  in CNF:
c    -b^{15, 75}_2 ∨ -b^{15, 75}_1 ∨ -b^{15, 75}_0 ∨ false 
c  in DIMACS:
-12737 -12738 -12739  0

c i = 76
c  -2+1 --> -1
c    ( b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧  p_1140) -> ( b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0)
c  in CNF:
c    -b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨  b^{15, 77}_2
c    -b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_1
c    -b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨  b^{15, 77}_0
c  in DIMACS:
-12740 -12741  12742 -1140  12743 0
-12740 -12741  12742 -1140 -12744 0
-12740 -12741  12742 -1140  12745 0

c  -1+1 --> 0
c    ( b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0 ∧  p_1140) -> (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧ -b^{15, 77}_0)
c  in CNF:
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_2
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_1
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_0
c  in DIMACS:
-12740  12741 -12742 -1140 -12743 0
-12740  12741 -12742 -1140 -12744 0
-12740  12741 -12742 -1140 -12745 0

c  0+1 --> 1
c    (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧  p_1140) -> (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0)
c  in CNF:
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_2
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_1
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨  b^{15, 77}_0
c  in DIMACS:
 12740  12741  12742 -1140 -12743 0
 12740  12741  12742 -1140 -12744 0
 12740  12741  12742 -1140  12745 0

c  1+1 --> 2
c    (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0 ∧  p_1140) -> (-b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0)
c  in CNF:
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_2
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨  b^{15, 77}_1
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ -p_1140 ∨ -b^{15, 77}_0
c  in DIMACS:
 12740  12741 -12742 -1140 -12743 0
 12740  12741 -12742 -1140  12744 0
 12740  12741 -12742 -1140 -12745 0

c  2+1 --> break 
c    (-b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 12740 -12741  12742 -1140 1162 0


c  2-1 --> 1
c    (-b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧ -p_1140) -> (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0)
c  in CNF:
c     b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_2
c     b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_1
c     b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨  b^{15, 77}_0
c  in DIMACS:
 12740 -12741  12742  1140 -12743 0
 12740 -12741  12742  1140 -12744 0
 12740 -12741  12742  1140  12745 0

c  1-1 --> 0
c    (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0 ∧ -p_1140) -> (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧ -b^{15, 77}_0)
c  in CNF:
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_2
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_1
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_0
c  in DIMACS:
 12740  12741 -12742  1140 -12743 0
 12740  12741 -12742  1140 -12744 0
 12740  12741 -12742  1140 -12745 0

c  0-1 --> -1
c    (-b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧ -p_1140) -> ( b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0)
c  in CNF:
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨  b^{15, 77}_2
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_1
c     b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨  b^{15, 77}_0
c  in DIMACS:
 12740  12741  12742  1140  12743 0
 12740  12741  12742  1140 -12744 0
 12740  12741  12742  1140  12745 0

c  -1-1 --> -2
c    ( b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧  b^{15, 76}_0 ∧ -p_1140) -> ( b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0)
c  in CNF:
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨  b^{15, 77}_2
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨  b^{15, 77}_1
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨  p_1140 ∨ -b^{15, 77}_0
c  in DIMACS:
-12740  12741 -12742  1140  12743 0
-12740  12741 -12742  1140  12744 0
-12740  12741 -12742  1140 -12745 0

c  -2-1 --> break 
c    ( b^{15, 76}_2 ∧  b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨  b^{15, 76}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-12740 -12741  12742  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 76}_2 ∧ -b^{15, 76}_1 ∧ -b^{15, 76}_0 ∧ true) 
c  in CNF:
c    -b^{15, 76}_2 ∨  b^{15, 76}_1 ∨  b^{15, 76}_0 ∨ false 
c  in DIMACS:
-12740  12741  12742  0

c  3 does not represent an automaton state.
c    -(-b^{15, 76}_2 ∧  b^{15, 76}_1 ∧  b^{15, 76}_0 ∧ true) 
c  in CNF:
c     b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ false 
c  in DIMACS:
 12740 -12741 -12742  0
c  -3 does not represent an automaton state.
c    -( b^{15, 76}_2 ∧  b^{15, 76}_1 ∧  b^{15, 76}_0 ∧ true) 
c  in CNF:
c    -b^{15, 76}_2 ∨ -b^{15, 76}_1 ∨ -b^{15, 76}_0 ∨ false 
c  in DIMACS:
-12740 -12741 -12742  0

c i = 77
c  -2+1 --> -1
c    ( b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧  p_1155) -> ( b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧  b^{15, 78}_0)
c  in CNF:
c    -b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨  b^{15, 78}_2
c    -b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_1
c    -b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨  b^{15, 78}_0
c  in DIMACS:
-12743 -12744  12745 -1155  12746 0
-12743 -12744  12745 -1155 -12747 0
-12743 -12744  12745 -1155  12748 0

c  -1+1 --> 0
c    ( b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0 ∧  p_1155) -> (-b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧ -b^{15, 78}_0)
c  in CNF:
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_2
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_1
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_0
c  in DIMACS:
-12743  12744 -12745 -1155 -12746 0
-12743  12744 -12745 -1155 -12747 0
-12743  12744 -12745 -1155 -12748 0

c  0+1 --> 1
c    (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧  p_1155) -> (-b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧  b^{15, 78}_0)
c  in CNF:
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_2
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_1
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨  b^{15, 78}_0
c  in DIMACS:
 12743  12744  12745 -1155 -12746 0
 12743  12744  12745 -1155 -12747 0
 12743  12744  12745 -1155  12748 0

c  1+1 --> 2
c    (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0 ∧  p_1155) -> (-b^{15, 78}_2 ∧  b^{15, 78}_1 ∧ -b^{15, 78}_0)
c  in CNF:
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_2
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨  b^{15, 78}_1
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ -p_1155 ∨ -b^{15, 78}_0
c  in DIMACS:
 12743  12744 -12745 -1155 -12746 0
 12743  12744 -12745 -1155  12747 0
 12743  12744 -12745 -1155 -12748 0

c  2+1 --> break 
c    (-b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 12743 -12744  12745 -1155 1162 0


c  2-1 --> 1
c    (-b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧ -p_1155) -> (-b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧  b^{15, 78}_0)
c  in CNF:
c     b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_2
c     b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_1
c     b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨  b^{15, 78}_0
c  in DIMACS:
 12743 -12744  12745  1155 -12746 0
 12743 -12744  12745  1155 -12747 0
 12743 -12744  12745  1155  12748 0

c  1-1 --> 0
c    (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0 ∧ -p_1155) -> (-b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧ -b^{15, 78}_0)
c  in CNF:
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_2
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_1
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_0
c  in DIMACS:
 12743  12744 -12745  1155 -12746 0
 12743  12744 -12745  1155 -12747 0
 12743  12744 -12745  1155 -12748 0

c  0-1 --> -1
c    (-b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧ -p_1155) -> ( b^{15, 78}_2 ∧ -b^{15, 78}_1 ∧  b^{15, 78}_0)
c  in CNF:
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨  b^{15, 78}_2
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_1
c     b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨  b^{15, 78}_0
c  in DIMACS:
 12743  12744  12745  1155  12746 0
 12743  12744  12745  1155 -12747 0
 12743  12744  12745  1155  12748 0

c  -1-1 --> -2
c    ( b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧  b^{15, 77}_0 ∧ -p_1155) -> ( b^{15, 78}_2 ∧  b^{15, 78}_1 ∧ -b^{15, 78}_0)
c  in CNF:
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨  b^{15, 78}_2
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨  b^{15, 78}_1
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨  p_1155 ∨ -b^{15, 78}_0
c  in DIMACS:
-12743  12744 -12745  1155  12746 0
-12743  12744 -12745  1155  12747 0
-12743  12744 -12745  1155 -12748 0

c  -2-1 --> break 
c    ( b^{15, 77}_2 ∧  b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨  b^{15, 77}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-12743 -12744  12745  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{15, 77}_2 ∧ -b^{15, 77}_1 ∧ -b^{15, 77}_0 ∧ true) 
c  in CNF:
c    -b^{15, 77}_2 ∨  b^{15, 77}_1 ∨  b^{15, 77}_0 ∨ false 
c  in DIMACS:
-12743  12744  12745  0

c  3 does not represent an automaton state.
c    -(-b^{15, 77}_2 ∧  b^{15, 77}_1 ∧  b^{15, 77}_0 ∧ true) 
c  in CNF:
c     b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ false 
c  in DIMACS:
 12743 -12744 -12745  0
c  -3 does not represent an automaton state.
c    -( b^{15, 77}_2 ∧  b^{15, 77}_1 ∧  b^{15, 77}_0 ∧ true) 
c  in CNF:
c    -b^{15, 77}_2 ∨ -b^{15, 77}_1 ∨ -b^{15, 77}_0 ∨ false 
c  in DIMACS:
-12743 -12744 -12745  0

c INIT for k = 16
c    -b^{16, 1}_2
c    -b^{16, 1}_1
c    -b^{16, 1}_0
c  in DIMACS:
-12749 0
-12750 0
-12751 0

c Transitions for k = 16
c i = 1
c  -2+1 --> -1
c    ( b^{16, 1}_2 ∧  b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧  p_16) -> ( b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0)
c  in CNF:
c    -b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨  b^{16, 2}_2
c    -b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_1
c    -b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨  b^{16, 2}_0
c  in DIMACS:
-12749 -12750  12751 -16  12752 0
-12749 -12750  12751 -16 -12753 0
-12749 -12750  12751 -16  12754 0

c  -1+1 --> 0
c    ( b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧  b^{16, 1}_0 ∧  p_16) -> (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧ -b^{16, 2}_0)
c  in CNF:
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_2
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_1
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_0
c  in DIMACS:
-12749  12750 -12751 -16 -12752 0
-12749  12750 -12751 -16 -12753 0
-12749  12750 -12751 -16 -12754 0

c  0+1 --> 1
c    (-b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧  p_16) -> (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0)
c  in CNF:
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_2
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_1
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨  b^{16, 2}_0
c  in DIMACS:
 12749  12750  12751 -16 -12752 0
 12749  12750  12751 -16 -12753 0
 12749  12750  12751 -16  12754 0

c  1+1 --> 2
c    (-b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧  b^{16, 1}_0 ∧  p_16) -> (-b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0)
c  in CNF:
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_2
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨  b^{16, 2}_1
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ -p_16 ∨ -b^{16, 2}_0
c  in DIMACS:
 12749  12750 -12751 -16 -12752 0
 12749  12750 -12751 -16  12753 0
 12749  12750 -12751 -16 -12754 0

c  2+1 --> break 
c    (-b^{16, 1}_2 ∧  b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧  p_16) -> break
c  in CNF:
c     b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ -p_16 ∨ break
c  in DIMACS:
 12749 -12750  12751 -16 1162 0


c  2-1 --> 1
c    (-b^{16, 1}_2 ∧  b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧ -p_16) -> (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0)
c  in CNF:
c     b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_2
c     b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_1
c     b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨  b^{16, 2}_0
c  in DIMACS:
 12749 -12750  12751  16 -12752 0
 12749 -12750  12751  16 -12753 0
 12749 -12750  12751  16  12754 0

c  1-1 --> 0
c    (-b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧  b^{16, 1}_0 ∧ -p_16) -> (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧ -b^{16, 2}_0)
c  in CNF:
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_2
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_1
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_0
c  in DIMACS:
 12749  12750 -12751  16 -12752 0
 12749  12750 -12751  16 -12753 0
 12749  12750 -12751  16 -12754 0

c  0-1 --> -1
c    (-b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧ -p_16) -> ( b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0)
c  in CNF:
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨  b^{16, 2}_2
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_1
c     b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨  b^{16, 2}_0
c  in DIMACS:
 12749  12750  12751  16  12752 0
 12749  12750  12751  16 -12753 0
 12749  12750  12751  16  12754 0

c  -1-1 --> -2
c    ( b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧  b^{16, 1}_0 ∧ -p_16) -> ( b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0)
c  in CNF:
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨  b^{16, 2}_2
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨  b^{16, 2}_1
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨  p_16 ∨ -b^{16, 2}_0
c  in DIMACS:
-12749  12750 -12751  16  12752 0
-12749  12750 -12751  16  12753 0
-12749  12750 -12751  16 -12754 0

c  -2-1 --> break 
c    ( b^{16, 1}_2 ∧  b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧ -p_16) -> break
c  in CNF:
c    -b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨  b^{16, 1}_0 ∨  p_16 ∨ break
c  in DIMACS:
-12749 -12750  12751  16 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 1}_2 ∧ -b^{16, 1}_1 ∧ -b^{16, 1}_0 ∧ true) 
c  in CNF:
c    -b^{16, 1}_2 ∨  b^{16, 1}_1 ∨  b^{16, 1}_0 ∨ false 
c  in DIMACS:
-12749  12750  12751  0

c  3 does not represent an automaton state.
c    -(-b^{16, 1}_2 ∧  b^{16, 1}_1 ∧  b^{16, 1}_0 ∧ true) 
c  in CNF:
c     b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ false 
c  in DIMACS:
 12749 -12750 -12751  0
c  -3 does not represent an automaton state.
c    -( b^{16, 1}_2 ∧  b^{16, 1}_1 ∧  b^{16, 1}_0 ∧ true) 
c  in CNF:
c    -b^{16, 1}_2 ∨ -b^{16, 1}_1 ∨ -b^{16, 1}_0 ∨ false 
c  in DIMACS:
-12749 -12750 -12751  0

c i = 2
c  -2+1 --> -1
c    ( b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧  p_32) -> ( b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0)
c  in CNF:
c    -b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨  b^{16, 3}_2
c    -b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_1
c    -b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨  b^{16, 3}_0
c  in DIMACS:
-12752 -12753  12754 -32  12755 0
-12752 -12753  12754 -32 -12756 0
-12752 -12753  12754 -32  12757 0

c  -1+1 --> 0
c    ( b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0 ∧  p_32) -> (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧ -b^{16, 3}_0)
c  in CNF:
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_2
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_1
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_0
c  in DIMACS:
-12752  12753 -12754 -32 -12755 0
-12752  12753 -12754 -32 -12756 0
-12752  12753 -12754 -32 -12757 0

c  0+1 --> 1
c    (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧  p_32) -> (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0)
c  in CNF:
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_2
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_1
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨  b^{16, 3}_0
c  in DIMACS:
 12752  12753  12754 -32 -12755 0
 12752  12753  12754 -32 -12756 0
 12752  12753  12754 -32  12757 0

c  1+1 --> 2
c    (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0 ∧  p_32) -> (-b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0)
c  in CNF:
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_2
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨  b^{16, 3}_1
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ -p_32 ∨ -b^{16, 3}_0
c  in DIMACS:
 12752  12753 -12754 -32 -12755 0
 12752  12753 -12754 -32  12756 0
 12752  12753 -12754 -32 -12757 0

c  2+1 --> break 
c    (-b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧  p_32) -> break
c  in CNF:
c     b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 12752 -12753  12754 -32 1162 0


c  2-1 --> 1
c    (-b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧ -p_32) -> (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0)
c  in CNF:
c     b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_2
c     b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_1
c     b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨  b^{16, 3}_0
c  in DIMACS:
 12752 -12753  12754  32 -12755 0
 12752 -12753  12754  32 -12756 0
 12752 -12753  12754  32  12757 0

c  1-1 --> 0
c    (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0 ∧ -p_32) -> (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧ -b^{16, 3}_0)
c  in CNF:
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_2
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_1
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_0
c  in DIMACS:
 12752  12753 -12754  32 -12755 0
 12752  12753 -12754  32 -12756 0
 12752  12753 -12754  32 -12757 0

c  0-1 --> -1
c    (-b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧ -p_32) -> ( b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0)
c  in CNF:
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨  b^{16, 3}_2
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_1
c     b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨  b^{16, 3}_0
c  in DIMACS:
 12752  12753  12754  32  12755 0
 12752  12753  12754  32 -12756 0
 12752  12753  12754  32  12757 0

c  -1-1 --> -2
c    ( b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧  b^{16, 2}_0 ∧ -p_32) -> ( b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0)
c  in CNF:
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨  b^{16, 3}_2
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨  b^{16, 3}_1
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨  p_32 ∨ -b^{16, 3}_0
c  in DIMACS:
-12752  12753 -12754  32  12755 0
-12752  12753 -12754  32  12756 0
-12752  12753 -12754  32 -12757 0

c  -2-1 --> break 
c    ( b^{16, 2}_2 ∧  b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨  b^{16, 2}_0 ∨  p_32 ∨ break
c  in DIMACS:
-12752 -12753  12754  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 2}_2 ∧ -b^{16, 2}_1 ∧ -b^{16, 2}_0 ∧ true) 
c  in CNF:
c    -b^{16, 2}_2 ∨  b^{16, 2}_1 ∨  b^{16, 2}_0 ∨ false 
c  in DIMACS:
-12752  12753  12754  0

c  3 does not represent an automaton state.
c    -(-b^{16, 2}_2 ∧  b^{16, 2}_1 ∧  b^{16, 2}_0 ∧ true) 
c  in CNF:
c     b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ false 
c  in DIMACS:
 12752 -12753 -12754  0
c  -3 does not represent an automaton state.
c    -( b^{16, 2}_2 ∧  b^{16, 2}_1 ∧  b^{16, 2}_0 ∧ true) 
c  in CNF:
c    -b^{16, 2}_2 ∨ -b^{16, 2}_1 ∨ -b^{16, 2}_0 ∨ false 
c  in DIMACS:
-12752 -12753 -12754  0

c i = 3
c  -2+1 --> -1
c    ( b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧  p_48) -> ( b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0)
c  in CNF:
c    -b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨  b^{16, 4}_2
c    -b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_1
c    -b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨  b^{16, 4}_0
c  in DIMACS:
-12755 -12756  12757 -48  12758 0
-12755 -12756  12757 -48 -12759 0
-12755 -12756  12757 -48  12760 0

c  -1+1 --> 0
c    ( b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0 ∧  p_48) -> (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧ -b^{16, 4}_0)
c  in CNF:
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_2
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_1
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_0
c  in DIMACS:
-12755  12756 -12757 -48 -12758 0
-12755  12756 -12757 -48 -12759 0
-12755  12756 -12757 -48 -12760 0

c  0+1 --> 1
c    (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧  p_48) -> (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0)
c  in CNF:
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_2
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_1
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨  b^{16, 4}_0
c  in DIMACS:
 12755  12756  12757 -48 -12758 0
 12755  12756  12757 -48 -12759 0
 12755  12756  12757 -48  12760 0

c  1+1 --> 2
c    (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0 ∧  p_48) -> (-b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0)
c  in CNF:
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_2
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨  b^{16, 4}_1
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ -p_48 ∨ -b^{16, 4}_0
c  in DIMACS:
 12755  12756 -12757 -48 -12758 0
 12755  12756 -12757 -48  12759 0
 12755  12756 -12757 -48 -12760 0

c  2+1 --> break 
c    (-b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧  p_48) -> break
c  in CNF:
c     b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 12755 -12756  12757 -48 1162 0


c  2-1 --> 1
c    (-b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧ -p_48) -> (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0)
c  in CNF:
c     b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_2
c     b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_1
c     b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨  b^{16, 4}_0
c  in DIMACS:
 12755 -12756  12757  48 -12758 0
 12755 -12756  12757  48 -12759 0
 12755 -12756  12757  48  12760 0

c  1-1 --> 0
c    (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0 ∧ -p_48) -> (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧ -b^{16, 4}_0)
c  in CNF:
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_2
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_1
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_0
c  in DIMACS:
 12755  12756 -12757  48 -12758 0
 12755  12756 -12757  48 -12759 0
 12755  12756 -12757  48 -12760 0

c  0-1 --> -1
c    (-b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧ -p_48) -> ( b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0)
c  in CNF:
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨  b^{16, 4}_2
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_1
c     b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨  b^{16, 4}_0
c  in DIMACS:
 12755  12756  12757  48  12758 0
 12755  12756  12757  48 -12759 0
 12755  12756  12757  48  12760 0

c  -1-1 --> -2
c    ( b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧  b^{16, 3}_0 ∧ -p_48) -> ( b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0)
c  in CNF:
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨  b^{16, 4}_2
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨  b^{16, 4}_1
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨  p_48 ∨ -b^{16, 4}_0
c  in DIMACS:
-12755  12756 -12757  48  12758 0
-12755  12756 -12757  48  12759 0
-12755  12756 -12757  48 -12760 0

c  -2-1 --> break 
c    ( b^{16, 3}_2 ∧  b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨  b^{16, 3}_0 ∨  p_48 ∨ break
c  in DIMACS:
-12755 -12756  12757  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 3}_2 ∧ -b^{16, 3}_1 ∧ -b^{16, 3}_0 ∧ true) 
c  in CNF:
c    -b^{16, 3}_2 ∨  b^{16, 3}_1 ∨  b^{16, 3}_0 ∨ false 
c  in DIMACS:
-12755  12756  12757  0

c  3 does not represent an automaton state.
c    -(-b^{16, 3}_2 ∧  b^{16, 3}_1 ∧  b^{16, 3}_0 ∧ true) 
c  in CNF:
c     b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ false 
c  in DIMACS:
 12755 -12756 -12757  0
c  -3 does not represent an automaton state.
c    -( b^{16, 3}_2 ∧  b^{16, 3}_1 ∧  b^{16, 3}_0 ∧ true) 
c  in CNF:
c    -b^{16, 3}_2 ∨ -b^{16, 3}_1 ∨ -b^{16, 3}_0 ∨ false 
c  in DIMACS:
-12755 -12756 -12757  0

c i = 4
c  -2+1 --> -1
c    ( b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧  p_64) -> ( b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0)
c  in CNF:
c    -b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨  b^{16, 5}_2
c    -b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_1
c    -b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨  b^{16, 5}_0
c  in DIMACS:
-12758 -12759  12760 -64  12761 0
-12758 -12759  12760 -64 -12762 0
-12758 -12759  12760 -64  12763 0

c  -1+1 --> 0
c    ( b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0 ∧  p_64) -> (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧ -b^{16, 5}_0)
c  in CNF:
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_2
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_1
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_0
c  in DIMACS:
-12758  12759 -12760 -64 -12761 0
-12758  12759 -12760 -64 -12762 0
-12758  12759 -12760 -64 -12763 0

c  0+1 --> 1
c    (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧  p_64) -> (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0)
c  in CNF:
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_2
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_1
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨  b^{16, 5}_0
c  in DIMACS:
 12758  12759  12760 -64 -12761 0
 12758  12759  12760 -64 -12762 0
 12758  12759  12760 -64  12763 0

c  1+1 --> 2
c    (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0 ∧  p_64) -> (-b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0)
c  in CNF:
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_2
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨  b^{16, 5}_1
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ -p_64 ∨ -b^{16, 5}_0
c  in DIMACS:
 12758  12759 -12760 -64 -12761 0
 12758  12759 -12760 -64  12762 0
 12758  12759 -12760 -64 -12763 0

c  2+1 --> break 
c    (-b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧  p_64) -> break
c  in CNF:
c     b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 12758 -12759  12760 -64 1162 0


c  2-1 --> 1
c    (-b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧ -p_64) -> (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0)
c  in CNF:
c     b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_2
c     b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_1
c     b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨  b^{16, 5}_0
c  in DIMACS:
 12758 -12759  12760  64 -12761 0
 12758 -12759  12760  64 -12762 0
 12758 -12759  12760  64  12763 0

c  1-1 --> 0
c    (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0 ∧ -p_64) -> (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧ -b^{16, 5}_0)
c  in CNF:
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_2
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_1
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_0
c  in DIMACS:
 12758  12759 -12760  64 -12761 0
 12758  12759 -12760  64 -12762 0
 12758  12759 -12760  64 -12763 0

c  0-1 --> -1
c    (-b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧ -p_64) -> ( b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0)
c  in CNF:
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨  b^{16, 5}_2
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_1
c     b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨  b^{16, 5}_0
c  in DIMACS:
 12758  12759  12760  64  12761 0
 12758  12759  12760  64 -12762 0
 12758  12759  12760  64  12763 0

c  -1-1 --> -2
c    ( b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧  b^{16, 4}_0 ∧ -p_64) -> ( b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0)
c  in CNF:
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨  b^{16, 5}_2
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨  b^{16, 5}_1
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨  p_64 ∨ -b^{16, 5}_0
c  in DIMACS:
-12758  12759 -12760  64  12761 0
-12758  12759 -12760  64  12762 0
-12758  12759 -12760  64 -12763 0

c  -2-1 --> break 
c    ( b^{16, 4}_2 ∧  b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨  b^{16, 4}_0 ∨  p_64 ∨ break
c  in DIMACS:
-12758 -12759  12760  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 4}_2 ∧ -b^{16, 4}_1 ∧ -b^{16, 4}_0 ∧ true) 
c  in CNF:
c    -b^{16, 4}_2 ∨  b^{16, 4}_1 ∨  b^{16, 4}_0 ∨ false 
c  in DIMACS:
-12758  12759  12760  0

c  3 does not represent an automaton state.
c    -(-b^{16, 4}_2 ∧  b^{16, 4}_1 ∧  b^{16, 4}_0 ∧ true) 
c  in CNF:
c     b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ false 
c  in DIMACS:
 12758 -12759 -12760  0
c  -3 does not represent an automaton state.
c    -( b^{16, 4}_2 ∧  b^{16, 4}_1 ∧  b^{16, 4}_0 ∧ true) 
c  in CNF:
c    -b^{16, 4}_2 ∨ -b^{16, 4}_1 ∨ -b^{16, 4}_0 ∨ false 
c  in DIMACS:
-12758 -12759 -12760  0

c i = 5
c  -2+1 --> -1
c    ( b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧  p_80) -> ( b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0)
c  in CNF:
c    -b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨  b^{16, 6}_2
c    -b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_1
c    -b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨  b^{16, 6}_0
c  in DIMACS:
-12761 -12762  12763 -80  12764 0
-12761 -12762  12763 -80 -12765 0
-12761 -12762  12763 -80  12766 0

c  -1+1 --> 0
c    ( b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0 ∧  p_80) -> (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧ -b^{16, 6}_0)
c  in CNF:
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_2
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_1
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_0
c  in DIMACS:
-12761  12762 -12763 -80 -12764 0
-12761  12762 -12763 -80 -12765 0
-12761  12762 -12763 -80 -12766 0

c  0+1 --> 1
c    (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧  p_80) -> (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0)
c  in CNF:
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_2
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_1
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨  b^{16, 6}_0
c  in DIMACS:
 12761  12762  12763 -80 -12764 0
 12761  12762  12763 -80 -12765 0
 12761  12762  12763 -80  12766 0

c  1+1 --> 2
c    (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0 ∧  p_80) -> (-b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0)
c  in CNF:
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_2
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨  b^{16, 6}_1
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ -p_80 ∨ -b^{16, 6}_0
c  in DIMACS:
 12761  12762 -12763 -80 -12764 0
 12761  12762 -12763 -80  12765 0
 12761  12762 -12763 -80 -12766 0

c  2+1 --> break 
c    (-b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧  p_80) -> break
c  in CNF:
c     b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 12761 -12762  12763 -80 1162 0


c  2-1 --> 1
c    (-b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧ -p_80) -> (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0)
c  in CNF:
c     b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_2
c     b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_1
c     b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨  b^{16, 6}_0
c  in DIMACS:
 12761 -12762  12763  80 -12764 0
 12761 -12762  12763  80 -12765 0
 12761 -12762  12763  80  12766 0

c  1-1 --> 0
c    (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0 ∧ -p_80) -> (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧ -b^{16, 6}_0)
c  in CNF:
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_2
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_1
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_0
c  in DIMACS:
 12761  12762 -12763  80 -12764 0
 12761  12762 -12763  80 -12765 0
 12761  12762 -12763  80 -12766 0

c  0-1 --> -1
c    (-b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧ -p_80) -> ( b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0)
c  in CNF:
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨  b^{16, 6}_2
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_1
c     b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨  b^{16, 6}_0
c  in DIMACS:
 12761  12762  12763  80  12764 0
 12761  12762  12763  80 -12765 0
 12761  12762  12763  80  12766 0

c  -1-1 --> -2
c    ( b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧  b^{16, 5}_0 ∧ -p_80) -> ( b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0)
c  in CNF:
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨  b^{16, 6}_2
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨  b^{16, 6}_1
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨  p_80 ∨ -b^{16, 6}_0
c  in DIMACS:
-12761  12762 -12763  80  12764 0
-12761  12762 -12763  80  12765 0
-12761  12762 -12763  80 -12766 0

c  -2-1 --> break 
c    ( b^{16, 5}_2 ∧  b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨  b^{16, 5}_0 ∨  p_80 ∨ break
c  in DIMACS:
-12761 -12762  12763  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 5}_2 ∧ -b^{16, 5}_1 ∧ -b^{16, 5}_0 ∧ true) 
c  in CNF:
c    -b^{16, 5}_2 ∨  b^{16, 5}_1 ∨  b^{16, 5}_0 ∨ false 
c  in DIMACS:
-12761  12762  12763  0

c  3 does not represent an automaton state.
c    -(-b^{16, 5}_2 ∧  b^{16, 5}_1 ∧  b^{16, 5}_0 ∧ true) 
c  in CNF:
c     b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ false 
c  in DIMACS:
 12761 -12762 -12763  0
c  -3 does not represent an automaton state.
c    -( b^{16, 5}_2 ∧  b^{16, 5}_1 ∧  b^{16, 5}_0 ∧ true) 
c  in CNF:
c    -b^{16, 5}_2 ∨ -b^{16, 5}_1 ∨ -b^{16, 5}_0 ∨ false 
c  in DIMACS:
-12761 -12762 -12763  0

c i = 6
c  -2+1 --> -1
c    ( b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧  p_96) -> ( b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0)
c  in CNF:
c    -b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨  b^{16, 7}_2
c    -b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_1
c    -b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨  b^{16, 7}_0
c  in DIMACS:
-12764 -12765  12766 -96  12767 0
-12764 -12765  12766 -96 -12768 0
-12764 -12765  12766 -96  12769 0

c  -1+1 --> 0
c    ( b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0 ∧  p_96) -> (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧ -b^{16, 7}_0)
c  in CNF:
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_2
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_1
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_0
c  in DIMACS:
-12764  12765 -12766 -96 -12767 0
-12764  12765 -12766 -96 -12768 0
-12764  12765 -12766 -96 -12769 0

c  0+1 --> 1
c    (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧  p_96) -> (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0)
c  in CNF:
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_2
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_1
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨  b^{16, 7}_0
c  in DIMACS:
 12764  12765  12766 -96 -12767 0
 12764  12765  12766 -96 -12768 0
 12764  12765  12766 -96  12769 0

c  1+1 --> 2
c    (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0 ∧  p_96) -> (-b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0)
c  in CNF:
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_2
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨  b^{16, 7}_1
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ -p_96 ∨ -b^{16, 7}_0
c  in DIMACS:
 12764  12765 -12766 -96 -12767 0
 12764  12765 -12766 -96  12768 0
 12764  12765 -12766 -96 -12769 0

c  2+1 --> break 
c    (-b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧  p_96) -> break
c  in CNF:
c     b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 12764 -12765  12766 -96 1162 0


c  2-1 --> 1
c    (-b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧ -p_96) -> (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0)
c  in CNF:
c     b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_2
c     b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_1
c     b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨  b^{16, 7}_0
c  in DIMACS:
 12764 -12765  12766  96 -12767 0
 12764 -12765  12766  96 -12768 0
 12764 -12765  12766  96  12769 0

c  1-1 --> 0
c    (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0 ∧ -p_96) -> (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧ -b^{16, 7}_0)
c  in CNF:
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_2
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_1
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_0
c  in DIMACS:
 12764  12765 -12766  96 -12767 0
 12764  12765 -12766  96 -12768 0
 12764  12765 -12766  96 -12769 0

c  0-1 --> -1
c    (-b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧ -p_96) -> ( b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0)
c  in CNF:
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨  b^{16, 7}_2
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_1
c     b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨  b^{16, 7}_0
c  in DIMACS:
 12764  12765  12766  96  12767 0
 12764  12765  12766  96 -12768 0
 12764  12765  12766  96  12769 0

c  -1-1 --> -2
c    ( b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧  b^{16, 6}_0 ∧ -p_96) -> ( b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0)
c  in CNF:
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨  b^{16, 7}_2
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨  b^{16, 7}_1
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨  p_96 ∨ -b^{16, 7}_0
c  in DIMACS:
-12764  12765 -12766  96  12767 0
-12764  12765 -12766  96  12768 0
-12764  12765 -12766  96 -12769 0

c  -2-1 --> break 
c    ( b^{16, 6}_2 ∧  b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨  b^{16, 6}_0 ∨  p_96 ∨ break
c  in DIMACS:
-12764 -12765  12766  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 6}_2 ∧ -b^{16, 6}_1 ∧ -b^{16, 6}_0 ∧ true) 
c  in CNF:
c    -b^{16, 6}_2 ∨  b^{16, 6}_1 ∨  b^{16, 6}_0 ∨ false 
c  in DIMACS:
-12764  12765  12766  0

c  3 does not represent an automaton state.
c    -(-b^{16, 6}_2 ∧  b^{16, 6}_1 ∧  b^{16, 6}_0 ∧ true) 
c  in CNF:
c     b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ false 
c  in DIMACS:
 12764 -12765 -12766  0
c  -3 does not represent an automaton state.
c    -( b^{16, 6}_2 ∧  b^{16, 6}_1 ∧  b^{16, 6}_0 ∧ true) 
c  in CNF:
c    -b^{16, 6}_2 ∨ -b^{16, 6}_1 ∨ -b^{16, 6}_0 ∨ false 
c  in DIMACS:
-12764 -12765 -12766  0

c i = 7
c  -2+1 --> -1
c    ( b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧  p_112) -> ( b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0)
c  in CNF:
c    -b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨  b^{16, 8}_2
c    -b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_1
c    -b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨  b^{16, 8}_0
c  in DIMACS:
-12767 -12768  12769 -112  12770 0
-12767 -12768  12769 -112 -12771 0
-12767 -12768  12769 -112  12772 0

c  -1+1 --> 0
c    ( b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0 ∧  p_112) -> (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧ -b^{16, 8}_0)
c  in CNF:
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_2
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_1
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_0
c  in DIMACS:
-12767  12768 -12769 -112 -12770 0
-12767  12768 -12769 -112 -12771 0
-12767  12768 -12769 -112 -12772 0

c  0+1 --> 1
c    (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧  p_112) -> (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0)
c  in CNF:
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_2
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_1
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨  b^{16, 8}_0
c  in DIMACS:
 12767  12768  12769 -112 -12770 0
 12767  12768  12769 -112 -12771 0
 12767  12768  12769 -112  12772 0

c  1+1 --> 2
c    (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0 ∧  p_112) -> (-b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0)
c  in CNF:
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_2
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨  b^{16, 8}_1
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ -p_112 ∨ -b^{16, 8}_0
c  in DIMACS:
 12767  12768 -12769 -112 -12770 0
 12767  12768 -12769 -112  12771 0
 12767  12768 -12769 -112 -12772 0

c  2+1 --> break 
c    (-b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧  p_112) -> break
c  in CNF:
c     b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 12767 -12768  12769 -112 1162 0


c  2-1 --> 1
c    (-b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧ -p_112) -> (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0)
c  in CNF:
c     b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_2
c     b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_1
c     b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨  b^{16, 8}_0
c  in DIMACS:
 12767 -12768  12769  112 -12770 0
 12767 -12768  12769  112 -12771 0
 12767 -12768  12769  112  12772 0

c  1-1 --> 0
c    (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0 ∧ -p_112) -> (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧ -b^{16, 8}_0)
c  in CNF:
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_2
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_1
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_0
c  in DIMACS:
 12767  12768 -12769  112 -12770 0
 12767  12768 -12769  112 -12771 0
 12767  12768 -12769  112 -12772 0

c  0-1 --> -1
c    (-b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧ -p_112) -> ( b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0)
c  in CNF:
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨  b^{16, 8}_2
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_1
c     b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨  b^{16, 8}_0
c  in DIMACS:
 12767  12768  12769  112  12770 0
 12767  12768  12769  112 -12771 0
 12767  12768  12769  112  12772 0

c  -1-1 --> -2
c    ( b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧  b^{16, 7}_0 ∧ -p_112) -> ( b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0)
c  in CNF:
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨  b^{16, 8}_2
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨  b^{16, 8}_1
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨  p_112 ∨ -b^{16, 8}_0
c  in DIMACS:
-12767  12768 -12769  112  12770 0
-12767  12768 -12769  112  12771 0
-12767  12768 -12769  112 -12772 0

c  -2-1 --> break 
c    ( b^{16, 7}_2 ∧  b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨  b^{16, 7}_0 ∨  p_112 ∨ break
c  in DIMACS:
-12767 -12768  12769  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 7}_2 ∧ -b^{16, 7}_1 ∧ -b^{16, 7}_0 ∧ true) 
c  in CNF:
c    -b^{16, 7}_2 ∨  b^{16, 7}_1 ∨  b^{16, 7}_0 ∨ false 
c  in DIMACS:
-12767  12768  12769  0

c  3 does not represent an automaton state.
c    -(-b^{16, 7}_2 ∧  b^{16, 7}_1 ∧  b^{16, 7}_0 ∧ true) 
c  in CNF:
c     b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ false 
c  in DIMACS:
 12767 -12768 -12769  0
c  -3 does not represent an automaton state.
c    -( b^{16, 7}_2 ∧  b^{16, 7}_1 ∧  b^{16, 7}_0 ∧ true) 
c  in CNF:
c    -b^{16, 7}_2 ∨ -b^{16, 7}_1 ∨ -b^{16, 7}_0 ∨ false 
c  in DIMACS:
-12767 -12768 -12769  0

c i = 8
c  -2+1 --> -1
c    ( b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧  p_128) -> ( b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0)
c  in CNF:
c    -b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨  b^{16, 9}_2
c    -b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_1
c    -b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨  b^{16, 9}_0
c  in DIMACS:
-12770 -12771  12772 -128  12773 0
-12770 -12771  12772 -128 -12774 0
-12770 -12771  12772 -128  12775 0

c  -1+1 --> 0
c    ( b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0 ∧  p_128) -> (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧ -b^{16, 9}_0)
c  in CNF:
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_2
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_1
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_0
c  in DIMACS:
-12770  12771 -12772 -128 -12773 0
-12770  12771 -12772 -128 -12774 0
-12770  12771 -12772 -128 -12775 0

c  0+1 --> 1
c    (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧  p_128) -> (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0)
c  in CNF:
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_2
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_1
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨  b^{16, 9}_0
c  in DIMACS:
 12770  12771  12772 -128 -12773 0
 12770  12771  12772 -128 -12774 0
 12770  12771  12772 -128  12775 0

c  1+1 --> 2
c    (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0 ∧  p_128) -> (-b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0)
c  in CNF:
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_2
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨  b^{16, 9}_1
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ -p_128 ∨ -b^{16, 9}_0
c  in DIMACS:
 12770  12771 -12772 -128 -12773 0
 12770  12771 -12772 -128  12774 0
 12770  12771 -12772 -128 -12775 0

c  2+1 --> break 
c    (-b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧  p_128) -> break
c  in CNF:
c     b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 12770 -12771  12772 -128 1162 0


c  2-1 --> 1
c    (-b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧ -p_128) -> (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0)
c  in CNF:
c     b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_2
c     b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_1
c     b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨  b^{16, 9}_0
c  in DIMACS:
 12770 -12771  12772  128 -12773 0
 12770 -12771  12772  128 -12774 0
 12770 -12771  12772  128  12775 0

c  1-1 --> 0
c    (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0 ∧ -p_128) -> (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧ -b^{16, 9}_0)
c  in CNF:
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_2
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_1
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_0
c  in DIMACS:
 12770  12771 -12772  128 -12773 0
 12770  12771 -12772  128 -12774 0
 12770  12771 -12772  128 -12775 0

c  0-1 --> -1
c    (-b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧ -p_128) -> ( b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0)
c  in CNF:
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨  b^{16, 9}_2
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_1
c     b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨  b^{16, 9}_0
c  in DIMACS:
 12770  12771  12772  128  12773 0
 12770  12771  12772  128 -12774 0
 12770  12771  12772  128  12775 0

c  -1-1 --> -2
c    ( b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧  b^{16, 8}_0 ∧ -p_128) -> ( b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0)
c  in CNF:
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨  b^{16, 9}_2
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨  b^{16, 9}_1
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨  p_128 ∨ -b^{16, 9}_0
c  in DIMACS:
-12770  12771 -12772  128  12773 0
-12770  12771 -12772  128  12774 0
-12770  12771 -12772  128 -12775 0

c  -2-1 --> break 
c    ( b^{16, 8}_2 ∧  b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨  b^{16, 8}_0 ∨  p_128 ∨ break
c  in DIMACS:
-12770 -12771  12772  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 8}_2 ∧ -b^{16, 8}_1 ∧ -b^{16, 8}_0 ∧ true) 
c  in CNF:
c    -b^{16, 8}_2 ∨  b^{16, 8}_1 ∨  b^{16, 8}_0 ∨ false 
c  in DIMACS:
-12770  12771  12772  0

c  3 does not represent an automaton state.
c    -(-b^{16, 8}_2 ∧  b^{16, 8}_1 ∧  b^{16, 8}_0 ∧ true) 
c  in CNF:
c     b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ false 
c  in DIMACS:
 12770 -12771 -12772  0
c  -3 does not represent an automaton state.
c    -( b^{16, 8}_2 ∧  b^{16, 8}_1 ∧  b^{16, 8}_0 ∧ true) 
c  in CNF:
c    -b^{16, 8}_2 ∨ -b^{16, 8}_1 ∨ -b^{16, 8}_0 ∨ false 
c  in DIMACS:
-12770 -12771 -12772  0

c i = 9
c  -2+1 --> -1
c    ( b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧  p_144) -> ( b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0)
c  in CNF:
c    -b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨  b^{16, 10}_2
c    -b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_1
c    -b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨  b^{16, 10}_0
c  in DIMACS:
-12773 -12774  12775 -144  12776 0
-12773 -12774  12775 -144 -12777 0
-12773 -12774  12775 -144  12778 0

c  -1+1 --> 0
c    ( b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0 ∧  p_144) -> (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧ -b^{16, 10}_0)
c  in CNF:
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_2
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_1
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_0
c  in DIMACS:
-12773  12774 -12775 -144 -12776 0
-12773  12774 -12775 -144 -12777 0
-12773  12774 -12775 -144 -12778 0

c  0+1 --> 1
c    (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧  p_144) -> (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0)
c  in CNF:
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_2
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_1
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨  b^{16, 10}_0
c  in DIMACS:
 12773  12774  12775 -144 -12776 0
 12773  12774  12775 -144 -12777 0
 12773  12774  12775 -144  12778 0

c  1+1 --> 2
c    (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0 ∧  p_144) -> (-b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0)
c  in CNF:
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_2
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨  b^{16, 10}_1
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ -p_144 ∨ -b^{16, 10}_0
c  in DIMACS:
 12773  12774 -12775 -144 -12776 0
 12773  12774 -12775 -144  12777 0
 12773  12774 -12775 -144 -12778 0

c  2+1 --> break 
c    (-b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧  p_144) -> break
c  in CNF:
c     b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 12773 -12774  12775 -144 1162 0


c  2-1 --> 1
c    (-b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧ -p_144) -> (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0)
c  in CNF:
c     b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_2
c     b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_1
c     b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨  b^{16, 10}_0
c  in DIMACS:
 12773 -12774  12775  144 -12776 0
 12773 -12774  12775  144 -12777 0
 12773 -12774  12775  144  12778 0

c  1-1 --> 0
c    (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0 ∧ -p_144) -> (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧ -b^{16, 10}_0)
c  in CNF:
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_2
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_1
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_0
c  in DIMACS:
 12773  12774 -12775  144 -12776 0
 12773  12774 -12775  144 -12777 0
 12773  12774 -12775  144 -12778 0

c  0-1 --> -1
c    (-b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧ -p_144) -> ( b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0)
c  in CNF:
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨  b^{16, 10}_2
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_1
c     b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨  b^{16, 10}_0
c  in DIMACS:
 12773  12774  12775  144  12776 0
 12773  12774  12775  144 -12777 0
 12773  12774  12775  144  12778 0

c  -1-1 --> -2
c    ( b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧  b^{16, 9}_0 ∧ -p_144) -> ( b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0)
c  in CNF:
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨  b^{16, 10}_2
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨  b^{16, 10}_1
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨  p_144 ∨ -b^{16, 10}_0
c  in DIMACS:
-12773  12774 -12775  144  12776 0
-12773  12774 -12775  144  12777 0
-12773  12774 -12775  144 -12778 0

c  -2-1 --> break 
c    ( b^{16, 9}_2 ∧  b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨  b^{16, 9}_0 ∨  p_144 ∨ break
c  in DIMACS:
-12773 -12774  12775  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 9}_2 ∧ -b^{16, 9}_1 ∧ -b^{16, 9}_0 ∧ true) 
c  in CNF:
c    -b^{16, 9}_2 ∨  b^{16, 9}_1 ∨  b^{16, 9}_0 ∨ false 
c  in DIMACS:
-12773  12774  12775  0

c  3 does not represent an automaton state.
c    -(-b^{16, 9}_2 ∧  b^{16, 9}_1 ∧  b^{16, 9}_0 ∧ true) 
c  in CNF:
c     b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ false 
c  in DIMACS:
 12773 -12774 -12775  0
c  -3 does not represent an automaton state.
c    -( b^{16, 9}_2 ∧  b^{16, 9}_1 ∧  b^{16, 9}_0 ∧ true) 
c  in CNF:
c    -b^{16, 9}_2 ∨ -b^{16, 9}_1 ∨ -b^{16, 9}_0 ∨ false 
c  in DIMACS:
-12773 -12774 -12775  0

c i = 10
c  -2+1 --> -1
c    ( b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧  p_160) -> ( b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0)
c  in CNF:
c    -b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨  b^{16, 11}_2
c    -b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_1
c    -b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨  b^{16, 11}_0
c  in DIMACS:
-12776 -12777  12778 -160  12779 0
-12776 -12777  12778 -160 -12780 0
-12776 -12777  12778 -160  12781 0

c  -1+1 --> 0
c    ( b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0 ∧  p_160) -> (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧ -b^{16, 11}_0)
c  in CNF:
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_2
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_1
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_0
c  in DIMACS:
-12776  12777 -12778 -160 -12779 0
-12776  12777 -12778 -160 -12780 0
-12776  12777 -12778 -160 -12781 0

c  0+1 --> 1
c    (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧  p_160) -> (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0)
c  in CNF:
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_2
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_1
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨  b^{16, 11}_0
c  in DIMACS:
 12776  12777  12778 -160 -12779 0
 12776  12777  12778 -160 -12780 0
 12776  12777  12778 -160  12781 0

c  1+1 --> 2
c    (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0 ∧  p_160) -> (-b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0)
c  in CNF:
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_2
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨  b^{16, 11}_1
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ -p_160 ∨ -b^{16, 11}_0
c  in DIMACS:
 12776  12777 -12778 -160 -12779 0
 12776  12777 -12778 -160  12780 0
 12776  12777 -12778 -160 -12781 0

c  2+1 --> break 
c    (-b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧  p_160) -> break
c  in CNF:
c     b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 12776 -12777  12778 -160 1162 0


c  2-1 --> 1
c    (-b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧ -p_160) -> (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0)
c  in CNF:
c     b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_2
c     b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_1
c     b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨  b^{16, 11}_0
c  in DIMACS:
 12776 -12777  12778  160 -12779 0
 12776 -12777  12778  160 -12780 0
 12776 -12777  12778  160  12781 0

c  1-1 --> 0
c    (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0 ∧ -p_160) -> (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧ -b^{16, 11}_0)
c  in CNF:
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_2
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_1
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_0
c  in DIMACS:
 12776  12777 -12778  160 -12779 0
 12776  12777 -12778  160 -12780 0
 12776  12777 -12778  160 -12781 0

c  0-1 --> -1
c    (-b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧ -p_160) -> ( b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0)
c  in CNF:
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨  b^{16, 11}_2
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_1
c     b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨  b^{16, 11}_0
c  in DIMACS:
 12776  12777  12778  160  12779 0
 12776  12777  12778  160 -12780 0
 12776  12777  12778  160  12781 0

c  -1-1 --> -2
c    ( b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧  b^{16, 10}_0 ∧ -p_160) -> ( b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0)
c  in CNF:
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨  b^{16, 11}_2
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨  b^{16, 11}_1
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨  p_160 ∨ -b^{16, 11}_0
c  in DIMACS:
-12776  12777 -12778  160  12779 0
-12776  12777 -12778  160  12780 0
-12776  12777 -12778  160 -12781 0

c  -2-1 --> break 
c    ( b^{16, 10}_2 ∧  b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨  b^{16, 10}_0 ∨  p_160 ∨ break
c  in DIMACS:
-12776 -12777  12778  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 10}_2 ∧ -b^{16, 10}_1 ∧ -b^{16, 10}_0 ∧ true) 
c  in CNF:
c    -b^{16, 10}_2 ∨  b^{16, 10}_1 ∨  b^{16, 10}_0 ∨ false 
c  in DIMACS:
-12776  12777  12778  0

c  3 does not represent an automaton state.
c    -(-b^{16, 10}_2 ∧  b^{16, 10}_1 ∧  b^{16, 10}_0 ∧ true) 
c  in CNF:
c     b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ false 
c  in DIMACS:
 12776 -12777 -12778  0
c  -3 does not represent an automaton state.
c    -( b^{16, 10}_2 ∧  b^{16, 10}_1 ∧  b^{16, 10}_0 ∧ true) 
c  in CNF:
c    -b^{16, 10}_2 ∨ -b^{16, 10}_1 ∨ -b^{16, 10}_0 ∨ false 
c  in DIMACS:
-12776 -12777 -12778  0

c i = 11
c  -2+1 --> -1
c    ( b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧  p_176) -> ( b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0)
c  in CNF:
c    -b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨  b^{16, 12}_2
c    -b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_1
c    -b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨  b^{16, 12}_0
c  in DIMACS:
-12779 -12780  12781 -176  12782 0
-12779 -12780  12781 -176 -12783 0
-12779 -12780  12781 -176  12784 0

c  -1+1 --> 0
c    ( b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0 ∧  p_176) -> (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧ -b^{16, 12}_0)
c  in CNF:
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_2
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_1
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_0
c  in DIMACS:
-12779  12780 -12781 -176 -12782 0
-12779  12780 -12781 -176 -12783 0
-12779  12780 -12781 -176 -12784 0

c  0+1 --> 1
c    (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧  p_176) -> (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0)
c  in CNF:
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_2
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_1
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨  b^{16, 12}_0
c  in DIMACS:
 12779  12780  12781 -176 -12782 0
 12779  12780  12781 -176 -12783 0
 12779  12780  12781 -176  12784 0

c  1+1 --> 2
c    (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0 ∧  p_176) -> (-b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0)
c  in CNF:
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_2
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨  b^{16, 12}_1
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ -p_176 ∨ -b^{16, 12}_0
c  in DIMACS:
 12779  12780 -12781 -176 -12782 0
 12779  12780 -12781 -176  12783 0
 12779  12780 -12781 -176 -12784 0

c  2+1 --> break 
c    (-b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧  p_176) -> break
c  in CNF:
c     b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 12779 -12780  12781 -176 1162 0


c  2-1 --> 1
c    (-b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧ -p_176) -> (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0)
c  in CNF:
c     b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_2
c     b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_1
c     b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨  b^{16, 12}_0
c  in DIMACS:
 12779 -12780  12781  176 -12782 0
 12779 -12780  12781  176 -12783 0
 12779 -12780  12781  176  12784 0

c  1-1 --> 0
c    (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0 ∧ -p_176) -> (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧ -b^{16, 12}_0)
c  in CNF:
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_2
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_1
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_0
c  in DIMACS:
 12779  12780 -12781  176 -12782 0
 12779  12780 -12781  176 -12783 0
 12779  12780 -12781  176 -12784 0

c  0-1 --> -1
c    (-b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧ -p_176) -> ( b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0)
c  in CNF:
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨  b^{16, 12}_2
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_1
c     b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨  b^{16, 12}_0
c  in DIMACS:
 12779  12780  12781  176  12782 0
 12779  12780  12781  176 -12783 0
 12779  12780  12781  176  12784 0

c  -1-1 --> -2
c    ( b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧  b^{16, 11}_0 ∧ -p_176) -> ( b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0)
c  in CNF:
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨  b^{16, 12}_2
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨  b^{16, 12}_1
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨  p_176 ∨ -b^{16, 12}_0
c  in DIMACS:
-12779  12780 -12781  176  12782 0
-12779  12780 -12781  176  12783 0
-12779  12780 -12781  176 -12784 0

c  -2-1 --> break 
c    ( b^{16, 11}_2 ∧  b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨  b^{16, 11}_0 ∨  p_176 ∨ break
c  in DIMACS:
-12779 -12780  12781  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 11}_2 ∧ -b^{16, 11}_1 ∧ -b^{16, 11}_0 ∧ true) 
c  in CNF:
c    -b^{16, 11}_2 ∨  b^{16, 11}_1 ∨  b^{16, 11}_0 ∨ false 
c  in DIMACS:
-12779  12780  12781  0

c  3 does not represent an automaton state.
c    -(-b^{16, 11}_2 ∧  b^{16, 11}_1 ∧  b^{16, 11}_0 ∧ true) 
c  in CNF:
c     b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ false 
c  in DIMACS:
 12779 -12780 -12781  0
c  -3 does not represent an automaton state.
c    -( b^{16, 11}_2 ∧  b^{16, 11}_1 ∧  b^{16, 11}_0 ∧ true) 
c  in CNF:
c    -b^{16, 11}_2 ∨ -b^{16, 11}_1 ∨ -b^{16, 11}_0 ∨ false 
c  in DIMACS:
-12779 -12780 -12781  0

c i = 12
c  -2+1 --> -1
c    ( b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧  p_192) -> ( b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0)
c  in CNF:
c    -b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨  b^{16, 13}_2
c    -b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_1
c    -b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨  b^{16, 13}_0
c  in DIMACS:
-12782 -12783  12784 -192  12785 0
-12782 -12783  12784 -192 -12786 0
-12782 -12783  12784 -192  12787 0

c  -1+1 --> 0
c    ( b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0 ∧  p_192) -> (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧ -b^{16, 13}_0)
c  in CNF:
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_2
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_1
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_0
c  in DIMACS:
-12782  12783 -12784 -192 -12785 0
-12782  12783 -12784 -192 -12786 0
-12782  12783 -12784 -192 -12787 0

c  0+1 --> 1
c    (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧  p_192) -> (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0)
c  in CNF:
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_2
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_1
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨  b^{16, 13}_0
c  in DIMACS:
 12782  12783  12784 -192 -12785 0
 12782  12783  12784 -192 -12786 0
 12782  12783  12784 -192  12787 0

c  1+1 --> 2
c    (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0 ∧  p_192) -> (-b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0)
c  in CNF:
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_2
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨  b^{16, 13}_1
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ -p_192 ∨ -b^{16, 13}_0
c  in DIMACS:
 12782  12783 -12784 -192 -12785 0
 12782  12783 -12784 -192  12786 0
 12782  12783 -12784 -192 -12787 0

c  2+1 --> break 
c    (-b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧  p_192) -> break
c  in CNF:
c     b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 12782 -12783  12784 -192 1162 0


c  2-1 --> 1
c    (-b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧ -p_192) -> (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0)
c  in CNF:
c     b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_2
c     b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_1
c     b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨  b^{16, 13}_0
c  in DIMACS:
 12782 -12783  12784  192 -12785 0
 12782 -12783  12784  192 -12786 0
 12782 -12783  12784  192  12787 0

c  1-1 --> 0
c    (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0 ∧ -p_192) -> (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧ -b^{16, 13}_0)
c  in CNF:
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_2
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_1
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_0
c  in DIMACS:
 12782  12783 -12784  192 -12785 0
 12782  12783 -12784  192 -12786 0
 12782  12783 -12784  192 -12787 0

c  0-1 --> -1
c    (-b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧ -p_192) -> ( b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0)
c  in CNF:
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨  b^{16, 13}_2
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_1
c     b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨  b^{16, 13}_0
c  in DIMACS:
 12782  12783  12784  192  12785 0
 12782  12783  12784  192 -12786 0
 12782  12783  12784  192  12787 0

c  -1-1 --> -2
c    ( b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧  b^{16, 12}_0 ∧ -p_192) -> ( b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0)
c  in CNF:
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨  b^{16, 13}_2
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨  b^{16, 13}_1
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨  p_192 ∨ -b^{16, 13}_0
c  in DIMACS:
-12782  12783 -12784  192  12785 0
-12782  12783 -12784  192  12786 0
-12782  12783 -12784  192 -12787 0

c  -2-1 --> break 
c    ( b^{16, 12}_2 ∧  b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨  b^{16, 12}_0 ∨  p_192 ∨ break
c  in DIMACS:
-12782 -12783  12784  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 12}_2 ∧ -b^{16, 12}_1 ∧ -b^{16, 12}_0 ∧ true) 
c  in CNF:
c    -b^{16, 12}_2 ∨  b^{16, 12}_1 ∨  b^{16, 12}_0 ∨ false 
c  in DIMACS:
-12782  12783  12784  0

c  3 does not represent an automaton state.
c    -(-b^{16, 12}_2 ∧  b^{16, 12}_1 ∧  b^{16, 12}_0 ∧ true) 
c  in CNF:
c     b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ false 
c  in DIMACS:
 12782 -12783 -12784  0
c  -3 does not represent an automaton state.
c    -( b^{16, 12}_2 ∧  b^{16, 12}_1 ∧  b^{16, 12}_0 ∧ true) 
c  in CNF:
c    -b^{16, 12}_2 ∨ -b^{16, 12}_1 ∨ -b^{16, 12}_0 ∨ false 
c  in DIMACS:
-12782 -12783 -12784  0

c i = 13
c  -2+1 --> -1
c    ( b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧  p_208) -> ( b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0)
c  in CNF:
c    -b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨  b^{16, 14}_2
c    -b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_1
c    -b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨  b^{16, 14}_0
c  in DIMACS:
-12785 -12786  12787 -208  12788 0
-12785 -12786  12787 -208 -12789 0
-12785 -12786  12787 -208  12790 0

c  -1+1 --> 0
c    ( b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0 ∧  p_208) -> (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧ -b^{16, 14}_0)
c  in CNF:
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_2
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_1
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_0
c  in DIMACS:
-12785  12786 -12787 -208 -12788 0
-12785  12786 -12787 -208 -12789 0
-12785  12786 -12787 -208 -12790 0

c  0+1 --> 1
c    (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧  p_208) -> (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0)
c  in CNF:
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_2
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_1
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨  b^{16, 14}_0
c  in DIMACS:
 12785  12786  12787 -208 -12788 0
 12785  12786  12787 -208 -12789 0
 12785  12786  12787 -208  12790 0

c  1+1 --> 2
c    (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0 ∧  p_208) -> (-b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0)
c  in CNF:
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_2
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨  b^{16, 14}_1
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ -p_208 ∨ -b^{16, 14}_0
c  in DIMACS:
 12785  12786 -12787 -208 -12788 0
 12785  12786 -12787 -208  12789 0
 12785  12786 -12787 -208 -12790 0

c  2+1 --> break 
c    (-b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧  p_208) -> break
c  in CNF:
c     b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 12785 -12786  12787 -208 1162 0


c  2-1 --> 1
c    (-b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧ -p_208) -> (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0)
c  in CNF:
c     b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_2
c     b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_1
c     b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨  b^{16, 14}_0
c  in DIMACS:
 12785 -12786  12787  208 -12788 0
 12785 -12786  12787  208 -12789 0
 12785 -12786  12787  208  12790 0

c  1-1 --> 0
c    (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0 ∧ -p_208) -> (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧ -b^{16, 14}_0)
c  in CNF:
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_2
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_1
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_0
c  in DIMACS:
 12785  12786 -12787  208 -12788 0
 12785  12786 -12787  208 -12789 0
 12785  12786 -12787  208 -12790 0

c  0-1 --> -1
c    (-b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧ -p_208) -> ( b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0)
c  in CNF:
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨  b^{16, 14}_2
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_1
c     b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨  b^{16, 14}_0
c  in DIMACS:
 12785  12786  12787  208  12788 0
 12785  12786  12787  208 -12789 0
 12785  12786  12787  208  12790 0

c  -1-1 --> -2
c    ( b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧  b^{16, 13}_0 ∧ -p_208) -> ( b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0)
c  in CNF:
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨  b^{16, 14}_2
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨  b^{16, 14}_1
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨  p_208 ∨ -b^{16, 14}_0
c  in DIMACS:
-12785  12786 -12787  208  12788 0
-12785  12786 -12787  208  12789 0
-12785  12786 -12787  208 -12790 0

c  -2-1 --> break 
c    ( b^{16, 13}_2 ∧  b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨  b^{16, 13}_0 ∨  p_208 ∨ break
c  in DIMACS:
-12785 -12786  12787  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 13}_2 ∧ -b^{16, 13}_1 ∧ -b^{16, 13}_0 ∧ true) 
c  in CNF:
c    -b^{16, 13}_2 ∨  b^{16, 13}_1 ∨  b^{16, 13}_0 ∨ false 
c  in DIMACS:
-12785  12786  12787  0

c  3 does not represent an automaton state.
c    -(-b^{16, 13}_2 ∧  b^{16, 13}_1 ∧  b^{16, 13}_0 ∧ true) 
c  in CNF:
c     b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ false 
c  in DIMACS:
 12785 -12786 -12787  0
c  -3 does not represent an automaton state.
c    -( b^{16, 13}_2 ∧  b^{16, 13}_1 ∧  b^{16, 13}_0 ∧ true) 
c  in CNF:
c    -b^{16, 13}_2 ∨ -b^{16, 13}_1 ∨ -b^{16, 13}_0 ∨ false 
c  in DIMACS:
-12785 -12786 -12787  0

c i = 14
c  -2+1 --> -1
c    ( b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧  p_224) -> ( b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0)
c  in CNF:
c    -b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨  b^{16, 15}_2
c    -b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_1
c    -b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨  b^{16, 15}_0
c  in DIMACS:
-12788 -12789  12790 -224  12791 0
-12788 -12789  12790 -224 -12792 0
-12788 -12789  12790 -224  12793 0

c  -1+1 --> 0
c    ( b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0 ∧  p_224) -> (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧ -b^{16, 15}_0)
c  in CNF:
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_2
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_1
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_0
c  in DIMACS:
-12788  12789 -12790 -224 -12791 0
-12788  12789 -12790 -224 -12792 0
-12788  12789 -12790 -224 -12793 0

c  0+1 --> 1
c    (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧  p_224) -> (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0)
c  in CNF:
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_2
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_1
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨  b^{16, 15}_0
c  in DIMACS:
 12788  12789  12790 -224 -12791 0
 12788  12789  12790 -224 -12792 0
 12788  12789  12790 -224  12793 0

c  1+1 --> 2
c    (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0 ∧  p_224) -> (-b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0)
c  in CNF:
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_2
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨  b^{16, 15}_1
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ -p_224 ∨ -b^{16, 15}_0
c  in DIMACS:
 12788  12789 -12790 -224 -12791 0
 12788  12789 -12790 -224  12792 0
 12788  12789 -12790 -224 -12793 0

c  2+1 --> break 
c    (-b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧  p_224) -> break
c  in CNF:
c     b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 12788 -12789  12790 -224 1162 0


c  2-1 --> 1
c    (-b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧ -p_224) -> (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0)
c  in CNF:
c     b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_2
c     b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_1
c     b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨  b^{16, 15}_0
c  in DIMACS:
 12788 -12789  12790  224 -12791 0
 12788 -12789  12790  224 -12792 0
 12788 -12789  12790  224  12793 0

c  1-1 --> 0
c    (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0 ∧ -p_224) -> (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧ -b^{16, 15}_0)
c  in CNF:
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_2
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_1
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_0
c  in DIMACS:
 12788  12789 -12790  224 -12791 0
 12788  12789 -12790  224 -12792 0
 12788  12789 -12790  224 -12793 0

c  0-1 --> -1
c    (-b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧ -p_224) -> ( b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0)
c  in CNF:
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨  b^{16, 15}_2
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_1
c     b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨  b^{16, 15}_0
c  in DIMACS:
 12788  12789  12790  224  12791 0
 12788  12789  12790  224 -12792 0
 12788  12789  12790  224  12793 0

c  -1-1 --> -2
c    ( b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧  b^{16, 14}_0 ∧ -p_224) -> ( b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0)
c  in CNF:
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨  b^{16, 15}_2
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨  b^{16, 15}_1
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨  p_224 ∨ -b^{16, 15}_0
c  in DIMACS:
-12788  12789 -12790  224  12791 0
-12788  12789 -12790  224  12792 0
-12788  12789 -12790  224 -12793 0

c  -2-1 --> break 
c    ( b^{16, 14}_2 ∧  b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨  b^{16, 14}_0 ∨  p_224 ∨ break
c  in DIMACS:
-12788 -12789  12790  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 14}_2 ∧ -b^{16, 14}_1 ∧ -b^{16, 14}_0 ∧ true) 
c  in CNF:
c    -b^{16, 14}_2 ∨  b^{16, 14}_1 ∨  b^{16, 14}_0 ∨ false 
c  in DIMACS:
-12788  12789  12790  0

c  3 does not represent an automaton state.
c    -(-b^{16, 14}_2 ∧  b^{16, 14}_1 ∧  b^{16, 14}_0 ∧ true) 
c  in CNF:
c     b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ false 
c  in DIMACS:
 12788 -12789 -12790  0
c  -3 does not represent an automaton state.
c    -( b^{16, 14}_2 ∧  b^{16, 14}_1 ∧  b^{16, 14}_0 ∧ true) 
c  in CNF:
c    -b^{16, 14}_2 ∨ -b^{16, 14}_1 ∨ -b^{16, 14}_0 ∨ false 
c  in DIMACS:
-12788 -12789 -12790  0

c i = 15
c  -2+1 --> -1
c    ( b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧  p_240) -> ( b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0)
c  in CNF:
c    -b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨  b^{16, 16}_2
c    -b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_1
c    -b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨  b^{16, 16}_0
c  in DIMACS:
-12791 -12792  12793 -240  12794 0
-12791 -12792  12793 -240 -12795 0
-12791 -12792  12793 -240  12796 0

c  -1+1 --> 0
c    ( b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0 ∧  p_240) -> (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧ -b^{16, 16}_0)
c  in CNF:
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_2
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_1
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_0
c  in DIMACS:
-12791  12792 -12793 -240 -12794 0
-12791  12792 -12793 -240 -12795 0
-12791  12792 -12793 -240 -12796 0

c  0+1 --> 1
c    (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧  p_240) -> (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0)
c  in CNF:
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_2
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_1
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨  b^{16, 16}_0
c  in DIMACS:
 12791  12792  12793 -240 -12794 0
 12791  12792  12793 -240 -12795 0
 12791  12792  12793 -240  12796 0

c  1+1 --> 2
c    (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0 ∧  p_240) -> (-b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0)
c  in CNF:
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_2
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨  b^{16, 16}_1
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ -p_240 ∨ -b^{16, 16}_0
c  in DIMACS:
 12791  12792 -12793 -240 -12794 0
 12791  12792 -12793 -240  12795 0
 12791  12792 -12793 -240 -12796 0

c  2+1 --> break 
c    (-b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧  p_240) -> break
c  in CNF:
c     b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 12791 -12792  12793 -240 1162 0


c  2-1 --> 1
c    (-b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧ -p_240) -> (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0)
c  in CNF:
c     b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_2
c     b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_1
c     b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨  b^{16, 16}_0
c  in DIMACS:
 12791 -12792  12793  240 -12794 0
 12791 -12792  12793  240 -12795 0
 12791 -12792  12793  240  12796 0

c  1-1 --> 0
c    (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0 ∧ -p_240) -> (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧ -b^{16, 16}_0)
c  in CNF:
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_2
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_1
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_0
c  in DIMACS:
 12791  12792 -12793  240 -12794 0
 12791  12792 -12793  240 -12795 0
 12791  12792 -12793  240 -12796 0

c  0-1 --> -1
c    (-b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧ -p_240) -> ( b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0)
c  in CNF:
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨  b^{16, 16}_2
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_1
c     b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨  b^{16, 16}_0
c  in DIMACS:
 12791  12792  12793  240  12794 0
 12791  12792  12793  240 -12795 0
 12791  12792  12793  240  12796 0

c  -1-1 --> -2
c    ( b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧  b^{16, 15}_0 ∧ -p_240) -> ( b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0)
c  in CNF:
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨  b^{16, 16}_2
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨  b^{16, 16}_1
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨  p_240 ∨ -b^{16, 16}_0
c  in DIMACS:
-12791  12792 -12793  240  12794 0
-12791  12792 -12793  240  12795 0
-12791  12792 -12793  240 -12796 0

c  -2-1 --> break 
c    ( b^{16, 15}_2 ∧  b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨  b^{16, 15}_0 ∨  p_240 ∨ break
c  in DIMACS:
-12791 -12792  12793  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 15}_2 ∧ -b^{16, 15}_1 ∧ -b^{16, 15}_0 ∧ true) 
c  in CNF:
c    -b^{16, 15}_2 ∨  b^{16, 15}_1 ∨  b^{16, 15}_0 ∨ false 
c  in DIMACS:
-12791  12792  12793  0

c  3 does not represent an automaton state.
c    -(-b^{16, 15}_2 ∧  b^{16, 15}_1 ∧  b^{16, 15}_0 ∧ true) 
c  in CNF:
c     b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ false 
c  in DIMACS:
 12791 -12792 -12793  0
c  -3 does not represent an automaton state.
c    -( b^{16, 15}_2 ∧  b^{16, 15}_1 ∧  b^{16, 15}_0 ∧ true) 
c  in CNF:
c    -b^{16, 15}_2 ∨ -b^{16, 15}_1 ∨ -b^{16, 15}_0 ∨ false 
c  in DIMACS:
-12791 -12792 -12793  0

c i = 16
c  -2+1 --> -1
c    ( b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧  p_256) -> ( b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0)
c  in CNF:
c    -b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨  b^{16, 17}_2
c    -b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_1
c    -b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨  b^{16, 17}_0
c  in DIMACS:
-12794 -12795  12796 -256  12797 0
-12794 -12795  12796 -256 -12798 0
-12794 -12795  12796 -256  12799 0

c  -1+1 --> 0
c    ( b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0 ∧  p_256) -> (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧ -b^{16, 17}_0)
c  in CNF:
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_2
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_1
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_0
c  in DIMACS:
-12794  12795 -12796 -256 -12797 0
-12794  12795 -12796 -256 -12798 0
-12794  12795 -12796 -256 -12799 0

c  0+1 --> 1
c    (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧  p_256) -> (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0)
c  in CNF:
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_2
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_1
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨  b^{16, 17}_0
c  in DIMACS:
 12794  12795  12796 -256 -12797 0
 12794  12795  12796 -256 -12798 0
 12794  12795  12796 -256  12799 0

c  1+1 --> 2
c    (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0 ∧  p_256) -> (-b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0)
c  in CNF:
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_2
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨  b^{16, 17}_1
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ -p_256 ∨ -b^{16, 17}_0
c  in DIMACS:
 12794  12795 -12796 -256 -12797 0
 12794  12795 -12796 -256  12798 0
 12794  12795 -12796 -256 -12799 0

c  2+1 --> break 
c    (-b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧  p_256) -> break
c  in CNF:
c     b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 12794 -12795  12796 -256 1162 0


c  2-1 --> 1
c    (-b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧ -p_256) -> (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0)
c  in CNF:
c     b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_2
c     b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_1
c     b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨  b^{16, 17}_0
c  in DIMACS:
 12794 -12795  12796  256 -12797 0
 12794 -12795  12796  256 -12798 0
 12794 -12795  12796  256  12799 0

c  1-1 --> 0
c    (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0 ∧ -p_256) -> (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧ -b^{16, 17}_0)
c  in CNF:
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_2
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_1
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_0
c  in DIMACS:
 12794  12795 -12796  256 -12797 0
 12794  12795 -12796  256 -12798 0
 12794  12795 -12796  256 -12799 0

c  0-1 --> -1
c    (-b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧ -p_256) -> ( b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0)
c  in CNF:
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨  b^{16, 17}_2
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_1
c     b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨  b^{16, 17}_0
c  in DIMACS:
 12794  12795  12796  256  12797 0
 12794  12795  12796  256 -12798 0
 12794  12795  12796  256  12799 0

c  -1-1 --> -2
c    ( b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧  b^{16, 16}_0 ∧ -p_256) -> ( b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0)
c  in CNF:
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨  b^{16, 17}_2
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨  b^{16, 17}_1
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨  p_256 ∨ -b^{16, 17}_0
c  in DIMACS:
-12794  12795 -12796  256  12797 0
-12794  12795 -12796  256  12798 0
-12794  12795 -12796  256 -12799 0

c  -2-1 --> break 
c    ( b^{16, 16}_2 ∧  b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨  b^{16, 16}_0 ∨  p_256 ∨ break
c  in DIMACS:
-12794 -12795  12796  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 16}_2 ∧ -b^{16, 16}_1 ∧ -b^{16, 16}_0 ∧ true) 
c  in CNF:
c    -b^{16, 16}_2 ∨  b^{16, 16}_1 ∨  b^{16, 16}_0 ∨ false 
c  in DIMACS:
-12794  12795  12796  0

c  3 does not represent an automaton state.
c    -(-b^{16, 16}_2 ∧  b^{16, 16}_1 ∧  b^{16, 16}_0 ∧ true) 
c  in CNF:
c     b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ false 
c  in DIMACS:
 12794 -12795 -12796  0
c  -3 does not represent an automaton state.
c    -( b^{16, 16}_2 ∧  b^{16, 16}_1 ∧  b^{16, 16}_0 ∧ true) 
c  in CNF:
c    -b^{16, 16}_2 ∨ -b^{16, 16}_1 ∨ -b^{16, 16}_0 ∨ false 
c  in DIMACS:
-12794 -12795 -12796  0

c i = 17
c  -2+1 --> -1
c    ( b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧  p_272) -> ( b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0)
c  in CNF:
c    -b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨  b^{16, 18}_2
c    -b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_1
c    -b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨  b^{16, 18}_0
c  in DIMACS:
-12797 -12798  12799 -272  12800 0
-12797 -12798  12799 -272 -12801 0
-12797 -12798  12799 -272  12802 0

c  -1+1 --> 0
c    ( b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0 ∧  p_272) -> (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧ -b^{16, 18}_0)
c  in CNF:
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_2
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_1
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_0
c  in DIMACS:
-12797  12798 -12799 -272 -12800 0
-12797  12798 -12799 -272 -12801 0
-12797  12798 -12799 -272 -12802 0

c  0+1 --> 1
c    (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧  p_272) -> (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0)
c  in CNF:
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_2
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_1
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨  b^{16, 18}_0
c  in DIMACS:
 12797  12798  12799 -272 -12800 0
 12797  12798  12799 -272 -12801 0
 12797  12798  12799 -272  12802 0

c  1+1 --> 2
c    (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0 ∧  p_272) -> (-b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0)
c  in CNF:
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_2
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨  b^{16, 18}_1
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ -p_272 ∨ -b^{16, 18}_0
c  in DIMACS:
 12797  12798 -12799 -272 -12800 0
 12797  12798 -12799 -272  12801 0
 12797  12798 -12799 -272 -12802 0

c  2+1 --> break 
c    (-b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧  p_272) -> break
c  in CNF:
c     b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 12797 -12798  12799 -272 1162 0


c  2-1 --> 1
c    (-b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧ -p_272) -> (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0)
c  in CNF:
c     b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_2
c     b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_1
c     b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨  b^{16, 18}_0
c  in DIMACS:
 12797 -12798  12799  272 -12800 0
 12797 -12798  12799  272 -12801 0
 12797 -12798  12799  272  12802 0

c  1-1 --> 0
c    (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0 ∧ -p_272) -> (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧ -b^{16, 18}_0)
c  in CNF:
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_2
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_1
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_0
c  in DIMACS:
 12797  12798 -12799  272 -12800 0
 12797  12798 -12799  272 -12801 0
 12797  12798 -12799  272 -12802 0

c  0-1 --> -1
c    (-b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧ -p_272) -> ( b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0)
c  in CNF:
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨  b^{16, 18}_2
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_1
c     b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨  b^{16, 18}_0
c  in DIMACS:
 12797  12798  12799  272  12800 0
 12797  12798  12799  272 -12801 0
 12797  12798  12799  272  12802 0

c  -1-1 --> -2
c    ( b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧  b^{16, 17}_0 ∧ -p_272) -> ( b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0)
c  in CNF:
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨  b^{16, 18}_2
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨  b^{16, 18}_1
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨  p_272 ∨ -b^{16, 18}_0
c  in DIMACS:
-12797  12798 -12799  272  12800 0
-12797  12798 -12799  272  12801 0
-12797  12798 -12799  272 -12802 0

c  -2-1 --> break 
c    ( b^{16, 17}_2 ∧  b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨  b^{16, 17}_0 ∨  p_272 ∨ break
c  in DIMACS:
-12797 -12798  12799  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 17}_2 ∧ -b^{16, 17}_1 ∧ -b^{16, 17}_0 ∧ true) 
c  in CNF:
c    -b^{16, 17}_2 ∨  b^{16, 17}_1 ∨  b^{16, 17}_0 ∨ false 
c  in DIMACS:
-12797  12798  12799  0

c  3 does not represent an automaton state.
c    -(-b^{16, 17}_2 ∧  b^{16, 17}_1 ∧  b^{16, 17}_0 ∧ true) 
c  in CNF:
c     b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ false 
c  in DIMACS:
 12797 -12798 -12799  0
c  -3 does not represent an automaton state.
c    -( b^{16, 17}_2 ∧  b^{16, 17}_1 ∧  b^{16, 17}_0 ∧ true) 
c  in CNF:
c    -b^{16, 17}_2 ∨ -b^{16, 17}_1 ∨ -b^{16, 17}_0 ∨ false 
c  in DIMACS:
-12797 -12798 -12799  0

c i = 18
c  -2+1 --> -1
c    ( b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧  p_288) -> ( b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0)
c  in CNF:
c    -b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨  b^{16, 19}_2
c    -b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_1
c    -b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨  b^{16, 19}_0
c  in DIMACS:
-12800 -12801  12802 -288  12803 0
-12800 -12801  12802 -288 -12804 0
-12800 -12801  12802 -288  12805 0

c  -1+1 --> 0
c    ( b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0 ∧  p_288) -> (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧ -b^{16, 19}_0)
c  in CNF:
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_2
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_1
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_0
c  in DIMACS:
-12800  12801 -12802 -288 -12803 0
-12800  12801 -12802 -288 -12804 0
-12800  12801 -12802 -288 -12805 0

c  0+1 --> 1
c    (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧  p_288) -> (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0)
c  in CNF:
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_2
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_1
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨  b^{16, 19}_0
c  in DIMACS:
 12800  12801  12802 -288 -12803 0
 12800  12801  12802 -288 -12804 0
 12800  12801  12802 -288  12805 0

c  1+1 --> 2
c    (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0 ∧  p_288) -> (-b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0)
c  in CNF:
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_2
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨  b^{16, 19}_1
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ -p_288 ∨ -b^{16, 19}_0
c  in DIMACS:
 12800  12801 -12802 -288 -12803 0
 12800  12801 -12802 -288  12804 0
 12800  12801 -12802 -288 -12805 0

c  2+1 --> break 
c    (-b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧  p_288) -> break
c  in CNF:
c     b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 12800 -12801  12802 -288 1162 0


c  2-1 --> 1
c    (-b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧ -p_288) -> (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0)
c  in CNF:
c     b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_2
c     b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_1
c     b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨  b^{16, 19}_0
c  in DIMACS:
 12800 -12801  12802  288 -12803 0
 12800 -12801  12802  288 -12804 0
 12800 -12801  12802  288  12805 0

c  1-1 --> 0
c    (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0 ∧ -p_288) -> (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧ -b^{16, 19}_0)
c  in CNF:
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_2
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_1
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_0
c  in DIMACS:
 12800  12801 -12802  288 -12803 0
 12800  12801 -12802  288 -12804 0
 12800  12801 -12802  288 -12805 0

c  0-1 --> -1
c    (-b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧ -p_288) -> ( b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0)
c  in CNF:
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨  b^{16, 19}_2
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_1
c     b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨  b^{16, 19}_0
c  in DIMACS:
 12800  12801  12802  288  12803 0
 12800  12801  12802  288 -12804 0
 12800  12801  12802  288  12805 0

c  -1-1 --> -2
c    ( b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧  b^{16, 18}_0 ∧ -p_288) -> ( b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0)
c  in CNF:
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨  b^{16, 19}_2
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨  b^{16, 19}_1
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨  p_288 ∨ -b^{16, 19}_0
c  in DIMACS:
-12800  12801 -12802  288  12803 0
-12800  12801 -12802  288  12804 0
-12800  12801 -12802  288 -12805 0

c  -2-1 --> break 
c    ( b^{16, 18}_2 ∧  b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨  b^{16, 18}_0 ∨  p_288 ∨ break
c  in DIMACS:
-12800 -12801  12802  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 18}_2 ∧ -b^{16, 18}_1 ∧ -b^{16, 18}_0 ∧ true) 
c  in CNF:
c    -b^{16, 18}_2 ∨  b^{16, 18}_1 ∨  b^{16, 18}_0 ∨ false 
c  in DIMACS:
-12800  12801  12802  0

c  3 does not represent an automaton state.
c    -(-b^{16, 18}_2 ∧  b^{16, 18}_1 ∧  b^{16, 18}_0 ∧ true) 
c  in CNF:
c     b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ false 
c  in DIMACS:
 12800 -12801 -12802  0
c  -3 does not represent an automaton state.
c    -( b^{16, 18}_2 ∧  b^{16, 18}_1 ∧  b^{16, 18}_0 ∧ true) 
c  in CNF:
c    -b^{16, 18}_2 ∨ -b^{16, 18}_1 ∨ -b^{16, 18}_0 ∨ false 
c  in DIMACS:
-12800 -12801 -12802  0

c i = 19
c  -2+1 --> -1
c    ( b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧  p_304) -> ( b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0)
c  in CNF:
c    -b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨  b^{16, 20}_2
c    -b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_1
c    -b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨  b^{16, 20}_0
c  in DIMACS:
-12803 -12804  12805 -304  12806 0
-12803 -12804  12805 -304 -12807 0
-12803 -12804  12805 -304  12808 0

c  -1+1 --> 0
c    ( b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0 ∧  p_304) -> (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧ -b^{16, 20}_0)
c  in CNF:
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_2
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_1
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_0
c  in DIMACS:
-12803  12804 -12805 -304 -12806 0
-12803  12804 -12805 -304 -12807 0
-12803  12804 -12805 -304 -12808 0

c  0+1 --> 1
c    (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧  p_304) -> (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0)
c  in CNF:
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_2
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_1
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨  b^{16, 20}_0
c  in DIMACS:
 12803  12804  12805 -304 -12806 0
 12803  12804  12805 -304 -12807 0
 12803  12804  12805 -304  12808 0

c  1+1 --> 2
c    (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0 ∧  p_304) -> (-b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0)
c  in CNF:
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_2
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨  b^{16, 20}_1
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ -p_304 ∨ -b^{16, 20}_0
c  in DIMACS:
 12803  12804 -12805 -304 -12806 0
 12803  12804 -12805 -304  12807 0
 12803  12804 -12805 -304 -12808 0

c  2+1 --> break 
c    (-b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧  p_304) -> break
c  in CNF:
c     b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 12803 -12804  12805 -304 1162 0


c  2-1 --> 1
c    (-b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧ -p_304) -> (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0)
c  in CNF:
c     b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_2
c     b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_1
c     b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨  b^{16, 20}_0
c  in DIMACS:
 12803 -12804  12805  304 -12806 0
 12803 -12804  12805  304 -12807 0
 12803 -12804  12805  304  12808 0

c  1-1 --> 0
c    (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0 ∧ -p_304) -> (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧ -b^{16, 20}_0)
c  in CNF:
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_2
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_1
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_0
c  in DIMACS:
 12803  12804 -12805  304 -12806 0
 12803  12804 -12805  304 -12807 0
 12803  12804 -12805  304 -12808 0

c  0-1 --> -1
c    (-b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧ -p_304) -> ( b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0)
c  in CNF:
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨  b^{16, 20}_2
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_1
c     b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨  b^{16, 20}_0
c  in DIMACS:
 12803  12804  12805  304  12806 0
 12803  12804  12805  304 -12807 0
 12803  12804  12805  304  12808 0

c  -1-1 --> -2
c    ( b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧  b^{16, 19}_0 ∧ -p_304) -> ( b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0)
c  in CNF:
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨  b^{16, 20}_2
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨  b^{16, 20}_1
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨  p_304 ∨ -b^{16, 20}_0
c  in DIMACS:
-12803  12804 -12805  304  12806 0
-12803  12804 -12805  304  12807 0
-12803  12804 -12805  304 -12808 0

c  -2-1 --> break 
c    ( b^{16, 19}_2 ∧  b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨  b^{16, 19}_0 ∨  p_304 ∨ break
c  in DIMACS:
-12803 -12804  12805  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 19}_2 ∧ -b^{16, 19}_1 ∧ -b^{16, 19}_0 ∧ true) 
c  in CNF:
c    -b^{16, 19}_2 ∨  b^{16, 19}_1 ∨  b^{16, 19}_0 ∨ false 
c  in DIMACS:
-12803  12804  12805  0

c  3 does not represent an automaton state.
c    -(-b^{16, 19}_2 ∧  b^{16, 19}_1 ∧  b^{16, 19}_0 ∧ true) 
c  in CNF:
c     b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ false 
c  in DIMACS:
 12803 -12804 -12805  0
c  -3 does not represent an automaton state.
c    -( b^{16, 19}_2 ∧  b^{16, 19}_1 ∧  b^{16, 19}_0 ∧ true) 
c  in CNF:
c    -b^{16, 19}_2 ∨ -b^{16, 19}_1 ∨ -b^{16, 19}_0 ∨ false 
c  in DIMACS:
-12803 -12804 -12805  0

c i = 20
c  -2+1 --> -1
c    ( b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧  p_320) -> ( b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0)
c  in CNF:
c    -b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨  b^{16, 21}_2
c    -b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_1
c    -b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨  b^{16, 21}_0
c  in DIMACS:
-12806 -12807  12808 -320  12809 0
-12806 -12807  12808 -320 -12810 0
-12806 -12807  12808 -320  12811 0

c  -1+1 --> 0
c    ( b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0 ∧  p_320) -> (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧ -b^{16, 21}_0)
c  in CNF:
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_2
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_1
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_0
c  in DIMACS:
-12806  12807 -12808 -320 -12809 0
-12806  12807 -12808 -320 -12810 0
-12806  12807 -12808 -320 -12811 0

c  0+1 --> 1
c    (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧  p_320) -> (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0)
c  in CNF:
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_2
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_1
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨  b^{16, 21}_0
c  in DIMACS:
 12806  12807  12808 -320 -12809 0
 12806  12807  12808 -320 -12810 0
 12806  12807  12808 -320  12811 0

c  1+1 --> 2
c    (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0 ∧  p_320) -> (-b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0)
c  in CNF:
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_2
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨  b^{16, 21}_1
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ -p_320 ∨ -b^{16, 21}_0
c  in DIMACS:
 12806  12807 -12808 -320 -12809 0
 12806  12807 -12808 -320  12810 0
 12806  12807 -12808 -320 -12811 0

c  2+1 --> break 
c    (-b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧  p_320) -> break
c  in CNF:
c     b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 12806 -12807  12808 -320 1162 0


c  2-1 --> 1
c    (-b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧ -p_320) -> (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0)
c  in CNF:
c     b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_2
c     b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_1
c     b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨  b^{16, 21}_0
c  in DIMACS:
 12806 -12807  12808  320 -12809 0
 12806 -12807  12808  320 -12810 0
 12806 -12807  12808  320  12811 0

c  1-1 --> 0
c    (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0 ∧ -p_320) -> (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧ -b^{16, 21}_0)
c  in CNF:
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_2
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_1
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_0
c  in DIMACS:
 12806  12807 -12808  320 -12809 0
 12806  12807 -12808  320 -12810 0
 12806  12807 -12808  320 -12811 0

c  0-1 --> -1
c    (-b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧ -p_320) -> ( b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0)
c  in CNF:
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨  b^{16, 21}_2
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_1
c     b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨  b^{16, 21}_0
c  in DIMACS:
 12806  12807  12808  320  12809 0
 12806  12807  12808  320 -12810 0
 12806  12807  12808  320  12811 0

c  -1-1 --> -2
c    ( b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧  b^{16, 20}_0 ∧ -p_320) -> ( b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0)
c  in CNF:
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨  b^{16, 21}_2
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨  b^{16, 21}_1
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨  p_320 ∨ -b^{16, 21}_0
c  in DIMACS:
-12806  12807 -12808  320  12809 0
-12806  12807 -12808  320  12810 0
-12806  12807 -12808  320 -12811 0

c  -2-1 --> break 
c    ( b^{16, 20}_2 ∧  b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨  b^{16, 20}_0 ∨  p_320 ∨ break
c  in DIMACS:
-12806 -12807  12808  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 20}_2 ∧ -b^{16, 20}_1 ∧ -b^{16, 20}_0 ∧ true) 
c  in CNF:
c    -b^{16, 20}_2 ∨  b^{16, 20}_1 ∨  b^{16, 20}_0 ∨ false 
c  in DIMACS:
-12806  12807  12808  0

c  3 does not represent an automaton state.
c    -(-b^{16, 20}_2 ∧  b^{16, 20}_1 ∧  b^{16, 20}_0 ∧ true) 
c  in CNF:
c     b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ false 
c  in DIMACS:
 12806 -12807 -12808  0
c  -3 does not represent an automaton state.
c    -( b^{16, 20}_2 ∧  b^{16, 20}_1 ∧  b^{16, 20}_0 ∧ true) 
c  in CNF:
c    -b^{16, 20}_2 ∨ -b^{16, 20}_1 ∨ -b^{16, 20}_0 ∨ false 
c  in DIMACS:
-12806 -12807 -12808  0

c i = 21
c  -2+1 --> -1
c    ( b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧  p_336) -> ( b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0)
c  in CNF:
c    -b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨  b^{16, 22}_2
c    -b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_1
c    -b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨  b^{16, 22}_0
c  in DIMACS:
-12809 -12810  12811 -336  12812 0
-12809 -12810  12811 -336 -12813 0
-12809 -12810  12811 -336  12814 0

c  -1+1 --> 0
c    ( b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0 ∧  p_336) -> (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧ -b^{16, 22}_0)
c  in CNF:
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_2
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_1
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_0
c  in DIMACS:
-12809  12810 -12811 -336 -12812 0
-12809  12810 -12811 -336 -12813 0
-12809  12810 -12811 -336 -12814 0

c  0+1 --> 1
c    (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧  p_336) -> (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0)
c  in CNF:
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_2
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_1
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨  b^{16, 22}_0
c  in DIMACS:
 12809  12810  12811 -336 -12812 0
 12809  12810  12811 -336 -12813 0
 12809  12810  12811 -336  12814 0

c  1+1 --> 2
c    (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0 ∧  p_336) -> (-b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0)
c  in CNF:
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_2
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨  b^{16, 22}_1
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ -p_336 ∨ -b^{16, 22}_0
c  in DIMACS:
 12809  12810 -12811 -336 -12812 0
 12809  12810 -12811 -336  12813 0
 12809  12810 -12811 -336 -12814 0

c  2+1 --> break 
c    (-b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧  p_336) -> break
c  in CNF:
c     b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 12809 -12810  12811 -336 1162 0


c  2-1 --> 1
c    (-b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧ -p_336) -> (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0)
c  in CNF:
c     b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_2
c     b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_1
c     b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨  b^{16, 22}_0
c  in DIMACS:
 12809 -12810  12811  336 -12812 0
 12809 -12810  12811  336 -12813 0
 12809 -12810  12811  336  12814 0

c  1-1 --> 0
c    (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0 ∧ -p_336) -> (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧ -b^{16, 22}_0)
c  in CNF:
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_2
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_1
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_0
c  in DIMACS:
 12809  12810 -12811  336 -12812 0
 12809  12810 -12811  336 -12813 0
 12809  12810 -12811  336 -12814 0

c  0-1 --> -1
c    (-b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧ -p_336) -> ( b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0)
c  in CNF:
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨  b^{16, 22}_2
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_1
c     b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨  b^{16, 22}_0
c  in DIMACS:
 12809  12810  12811  336  12812 0
 12809  12810  12811  336 -12813 0
 12809  12810  12811  336  12814 0

c  -1-1 --> -2
c    ( b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧  b^{16, 21}_0 ∧ -p_336) -> ( b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0)
c  in CNF:
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨  b^{16, 22}_2
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨  b^{16, 22}_1
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨  p_336 ∨ -b^{16, 22}_0
c  in DIMACS:
-12809  12810 -12811  336  12812 0
-12809  12810 -12811  336  12813 0
-12809  12810 -12811  336 -12814 0

c  -2-1 --> break 
c    ( b^{16, 21}_2 ∧  b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨  b^{16, 21}_0 ∨  p_336 ∨ break
c  in DIMACS:
-12809 -12810  12811  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 21}_2 ∧ -b^{16, 21}_1 ∧ -b^{16, 21}_0 ∧ true) 
c  in CNF:
c    -b^{16, 21}_2 ∨  b^{16, 21}_1 ∨  b^{16, 21}_0 ∨ false 
c  in DIMACS:
-12809  12810  12811  0

c  3 does not represent an automaton state.
c    -(-b^{16, 21}_2 ∧  b^{16, 21}_1 ∧  b^{16, 21}_0 ∧ true) 
c  in CNF:
c     b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ false 
c  in DIMACS:
 12809 -12810 -12811  0
c  -3 does not represent an automaton state.
c    -( b^{16, 21}_2 ∧  b^{16, 21}_1 ∧  b^{16, 21}_0 ∧ true) 
c  in CNF:
c    -b^{16, 21}_2 ∨ -b^{16, 21}_1 ∨ -b^{16, 21}_0 ∨ false 
c  in DIMACS:
-12809 -12810 -12811  0

c i = 22
c  -2+1 --> -1
c    ( b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧  p_352) -> ( b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0)
c  in CNF:
c    -b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨  b^{16, 23}_2
c    -b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_1
c    -b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨  b^{16, 23}_0
c  in DIMACS:
-12812 -12813  12814 -352  12815 0
-12812 -12813  12814 -352 -12816 0
-12812 -12813  12814 -352  12817 0

c  -1+1 --> 0
c    ( b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0 ∧  p_352) -> (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧ -b^{16, 23}_0)
c  in CNF:
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_2
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_1
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_0
c  in DIMACS:
-12812  12813 -12814 -352 -12815 0
-12812  12813 -12814 -352 -12816 0
-12812  12813 -12814 -352 -12817 0

c  0+1 --> 1
c    (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧  p_352) -> (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0)
c  in CNF:
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_2
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_1
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨  b^{16, 23}_0
c  in DIMACS:
 12812  12813  12814 -352 -12815 0
 12812  12813  12814 -352 -12816 0
 12812  12813  12814 -352  12817 0

c  1+1 --> 2
c    (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0 ∧  p_352) -> (-b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0)
c  in CNF:
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_2
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨  b^{16, 23}_1
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ -p_352 ∨ -b^{16, 23}_0
c  in DIMACS:
 12812  12813 -12814 -352 -12815 0
 12812  12813 -12814 -352  12816 0
 12812  12813 -12814 -352 -12817 0

c  2+1 --> break 
c    (-b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧  p_352) -> break
c  in CNF:
c     b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 12812 -12813  12814 -352 1162 0


c  2-1 --> 1
c    (-b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧ -p_352) -> (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0)
c  in CNF:
c     b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_2
c     b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_1
c     b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨  b^{16, 23}_0
c  in DIMACS:
 12812 -12813  12814  352 -12815 0
 12812 -12813  12814  352 -12816 0
 12812 -12813  12814  352  12817 0

c  1-1 --> 0
c    (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0 ∧ -p_352) -> (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧ -b^{16, 23}_0)
c  in CNF:
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_2
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_1
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_0
c  in DIMACS:
 12812  12813 -12814  352 -12815 0
 12812  12813 -12814  352 -12816 0
 12812  12813 -12814  352 -12817 0

c  0-1 --> -1
c    (-b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧ -p_352) -> ( b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0)
c  in CNF:
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨  b^{16, 23}_2
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_1
c     b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨  b^{16, 23}_0
c  in DIMACS:
 12812  12813  12814  352  12815 0
 12812  12813  12814  352 -12816 0
 12812  12813  12814  352  12817 0

c  -1-1 --> -2
c    ( b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧  b^{16, 22}_0 ∧ -p_352) -> ( b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0)
c  in CNF:
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨  b^{16, 23}_2
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨  b^{16, 23}_1
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨  p_352 ∨ -b^{16, 23}_0
c  in DIMACS:
-12812  12813 -12814  352  12815 0
-12812  12813 -12814  352  12816 0
-12812  12813 -12814  352 -12817 0

c  -2-1 --> break 
c    ( b^{16, 22}_2 ∧  b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨  b^{16, 22}_0 ∨  p_352 ∨ break
c  in DIMACS:
-12812 -12813  12814  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 22}_2 ∧ -b^{16, 22}_1 ∧ -b^{16, 22}_0 ∧ true) 
c  in CNF:
c    -b^{16, 22}_2 ∨  b^{16, 22}_1 ∨  b^{16, 22}_0 ∨ false 
c  in DIMACS:
-12812  12813  12814  0

c  3 does not represent an automaton state.
c    -(-b^{16, 22}_2 ∧  b^{16, 22}_1 ∧  b^{16, 22}_0 ∧ true) 
c  in CNF:
c     b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ false 
c  in DIMACS:
 12812 -12813 -12814  0
c  -3 does not represent an automaton state.
c    -( b^{16, 22}_2 ∧  b^{16, 22}_1 ∧  b^{16, 22}_0 ∧ true) 
c  in CNF:
c    -b^{16, 22}_2 ∨ -b^{16, 22}_1 ∨ -b^{16, 22}_0 ∨ false 
c  in DIMACS:
-12812 -12813 -12814  0

c i = 23
c  -2+1 --> -1
c    ( b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧  p_368) -> ( b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0)
c  in CNF:
c    -b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨  b^{16, 24}_2
c    -b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_1
c    -b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨  b^{16, 24}_0
c  in DIMACS:
-12815 -12816  12817 -368  12818 0
-12815 -12816  12817 -368 -12819 0
-12815 -12816  12817 -368  12820 0

c  -1+1 --> 0
c    ( b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0 ∧  p_368) -> (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧ -b^{16, 24}_0)
c  in CNF:
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_2
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_1
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_0
c  in DIMACS:
-12815  12816 -12817 -368 -12818 0
-12815  12816 -12817 -368 -12819 0
-12815  12816 -12817 -368 -12820 0

c  0+1 --> 1
c    (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧  p_368) -> (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0)
c  in CNF:
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_2
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_1
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨  b^{16, 24}_0
c  in DIMACS:
 12815  12816  12817 -368 -12818 0
 12815  12816  12817 -368 -12819 0
 12815  12816  12817 -368  12820 0

c  1+1 --> 2
c    (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0 ∧  p_368) -> (-b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0)
c  in CNF:
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_2
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨  b^{16, 24}_1
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ -p_368 ∨ -b^{16, 24}_0
c  in DIMACS:
 12815  12816 -12817 -368 -12818 0
 12815  12816 -12817 -368  12819 0
 12815  12816 -12817 -368 -12820 0

c  2+1 --> break 
c    (-b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧  p_368) -> break
c  in CNF:
c     b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 12815 -12816  12817 -368 1162 0


c  2-1 --> 1
c    (-b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧ -p_368) -> (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0)
c  in CNF:
c     b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_2
c     b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_1
c     b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨  b^{16, 24}_0
c  in DIMACS:
 12815 -12816  12817  368 -12818 0
 12815 -12816  12817  368 -12819 0
 12815 -12816  12817  368  12820 0

c  1-1 --> 0
c    (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0 ∧ -p_368) -> (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧ -b^{16, 24}_0)
c  in CNF:
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_2
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_1
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_0
c  in DIMACS:
 12815  12816 -12817  368 -12818 0
 12815  12816 -12817  368 -12819 0
 12815  12816 -12817  368 -12820 0

c  0-1 --> -1
c    (-b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧ -p_368) -> ( b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0)
c  in CNF:
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨  b^{16, 24}_2
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_1
c     b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨  b^{16, 24}_0
c  in DIMACS:
 12815  12816  12817  368  12818 0
 12815  12816  12817  368 -12819 0
 12815  12816  12817  368  12820 0

c  -1-1 --> -2
c    ( b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧  b^{16, 23}_0 ∧ -p_368) -> ( b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0)
c  in CNF:
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨  b^{16, 24}_2
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨  b^{16, 24}_1
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨  p_368 ∨ -b^{16, 24}_0
c  in DIMACS:
-12815  12816 -12817  368  12818 0
-12815  12816 -12817  368  12819 0
-12815  12816 -12817  368 -12820 0

c  -2-1 --> break 
c    ( b^{16, 23}_2 ∧  b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨  b^{16, 23}_0 ∨  p_368 ∨ break
c  in DIMACS:
-12815 -12816  12817  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 23}_2 ∧ -b^{16, 23}_1 ∧ -b^{16, 23}_0 ∧ true) 
c  in CNF:
c    -b^{16, 23}_2 ∨  b^{16, 23}_1 ∨  b^{16, 23}_0 ∨ false 
c  in DIMACS:
-12815  12816  12817  0

c  3 does not represent an automaton state.
c    -(-b^{16, 23}_2 ∧  b^{16, 23}_1 ∧  b^{16, 23}_0 ∧ true) 
c  in CNF:
c     b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ false 
c  in DIMACS:
 12815 -12816 -12817  0
c  -3 does not represent an automaton state.
c    -( b^{16, 23}_2 ∧  b^{16, 23}_1 ∧  b^{16, 23}_0 ∧ true) 
c  in CNF:
c    -b^{16, 23}_2 ∨ -b^{16, 23}_1 ∨ -b^{16, 23}_0 ∨ false 
c  in DIMACS:
-12815 -12816 -12817  0

c i = 24
c  -2+1 --> -1
c    ( b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧  p_384) -> ( b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0)
c  in CNF:
c    -b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨  b^{16, 25}_2
c    -b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_1
c    -b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨  b^{16, 25}_0
c  in DIMACS:
-12818 -12819  12820 -384  12821 0
-12818 -12819  12820 -384 -12822 0
-12818 -12819  12820 -384  12823 0

c  -1+1 --> 0
c    ( b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0 ∧  p_384) -> (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧ -b^{16, 25}_0)
c  in CNF:
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_2
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_1
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_0
c  in DIMACS:
-12818  12819 -12820 -384 -12821 0
-12818  12819 -12820 -384 -12822 0
-12818  12819 -12820 -384 -12823 0

c  0+1 --> 1
c    (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧  p_384) -> (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0)
c  in CNF:
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_2
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_1
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨  b^{16, 25}_0
c  in DIMACS:
 12818  12819  12820 -384 -12821 0
 12818  12819  12820 -384 -12822 0
 12818  12819  12820 -384  12823 0

c  1+1 --> 2
c    (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0 ∧  p_384) -> (-b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0)
c  in CNF:
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_2
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨  b^{16, 25}_1
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ -p_384 ∨ -b^{16, 25}_0
c  in DIMACS:
 12818  12819 -12820 -384 -12821 0
 12818  12819 -12820 -384  12822 0
 12818  12819 -12820 -384 -12823 0

c  2+1 --> break 
c    (-b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧  p_384) -> break
c  in CNF:
c     b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 12818 -12819  12820 -384 1162 0


c  2-1 --> 1
c    (-b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧ -p_384) -> (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0)
c  in CNF:
c     b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_2
c     b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_1
c     b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨  b^{16, 25}_0
c  in DIMACS:
 12818 -12819  12820  384 -12821 0
 12818 -12819  12820  384 -12822 0
 12818 -12819  12820  384  12823 0

c  1-1 --> 0
c    (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0 ∧ -p_384) -> (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧ -b^{16, 25}_0)
c  in CNF:
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_2
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_1
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_0
c  in DIMACS:
 12818  12819 -12820  384 -12821 0
 12818  12819 -12820  384 -12822 0
 12818  12819 -12820  384 -12823 0

c  0-1 --> -1
c    (-b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧ -p_384) -> ( b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0)
c  in CNF:
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨  b^{16, 25}_2
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_1
c     b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨  b^{16, 25}_0
c  in DIMACS:
 12818  12819  12820  384  12821 0
 12818  12819  12820  384 -12822 0
 12818  12819  12820  384  12823 0

c  -1-1 --> -2
c    ( b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧  b^{16, 24}_0 ∧ -p_384) -> ( b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0)
c  in CNF:
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨  b^{16, 25}_2
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨  b^{16, 25}_1
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨  p_384 ∨ -b^{16, 25}_0
c  in DIMACS:
-12818  12819 -12820  384  12821 0
-12818  12819 -12820  384  12822 0
-12818  12819 -12820  384 -12823 0

c  -2-1 --> break 
c    ( b^{16, 24}_2 ∧  b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨  b^{16, 24}_0 ∨  p_384 ∨ break
c  in DIMACS:
-12818 -12819  12820  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 24}_2 ∧ -b^{16, 24}_1 ∧ -b^{16, 24}_0 ∧ true) 
c  in CNF:
c    -b^{16, 24}_2 ∨  b^{16, 24}_1 ∨  b^{16, 24}_0 ∨ false 
c  in DIMACS:
-12818  12819  12820  0

c  3 does not represent an automaton state.
c    -(-b^{16, 24}_2 ∧  b^{16, 24}_1 ∧  b^{16, 24}_0 ∧ true) 
c  in CNF:
c     b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ false 
c  in DIMACS:
 12818 -12819 -12820  0
c  -3 does not represent an automaton state.
c    -( b^{16, 24}_2 ∧  b^{16, 24}_1 ∧  b^{16, 24}_0 ∧ true) 
c  in CNF:
c    -b^{16, 24}_2 ∨ -b^{16, 24}_1 ∨ -b^{16, 24}_0 ∨ false 
c  in DIMACS:
-12818 -12819 -12820  0

c i = 25
c  -2+1 --> -1
c    ( b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧  p_400) -> ( b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0)
c  in CNF:
c    -b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨  b^{16, 26}_2
c    -b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_1
c    -b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨  b^{16, 26}_0
c  in DIMACS:
-12821 -12822  12823 -400  12824 0
-12821 -12822  12823 -400 -12825 0
-12821 -12822  12823 -400  12826 0

c  -1+1 --> 0
c    ( b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0 ∧  p_400) -> (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧ -b^{16, 26}_0)
c  in CNF:
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_2
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_1
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_0
c  in DIMACS:
-12821  12822 -12823 -400 -12824 0
-12821  12822 -12823 -400 -12825 0
-12821  12822 -12823 -400 -12826 0

c  0+1 --> 1
c    (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧  p_400) -> (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0)
c  in CNF:
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_2
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_1
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨  b^{16, 26}_0
c  in DIMACS:
 12821  12822  12823 -400 -12824 0
 12821  12822  12823 -400 -12825 0
 12821  12822  12823 -400  12826 0

c  1+1 --> 2
c    (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0 ∧  p_400) -> (-b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0)
c  in CNF:
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_2
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨  b^{16, 26}_1
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ -p_400 ∨ -b^{16, 26}_0
c  in DIMACS:
 12821  12822 -12823 -400 -12824 0
 12821  12822 -12823 -400  12825 0
 12821  12822 -12823 -400 -12826 0

c  2+1 --> break 
c    (-b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧  p_400) -> break
c  in CNF:
c     b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 12821 -12822  12823 -400 1162 0


c  2-1 --> 1
c    (-b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧ -p_400) -> (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0)
c  in CNF:
c     b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_2
c     b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_1
c     b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨  b^{16, 26}_0
c  in DIMACS:
 12821 -12822  12823  400 -12824 0
 12821 -12822  12823  400 -12825 0
 12821 -12822  12823  400  12826 0

c  1-1 --> 0
c    (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0 ∧ -p_400) -> (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧ -b^{16, 26}_0)
c  in CNF:
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_2
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_1
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_0
c  in DIMACS:
 12821  12822 -12823  400 -12824 0
 12821  12822 -12823  400 -12825 0
 12821  12822 -12823  400 -12826 0

c  0-1 --> -1
c    (-b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧ -p_400) -> ( b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0)
c  in CNF:
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨  b^{16, 26}_2
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_1
c     b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨  b^{16, 26}_0
c  in DIMACS:
 12821  12822  12823  400  12824 0
 12821  12822  12823  400 -12825 0
 12821  12822  12823  400  12826 0

c  -1-1 --> -2
c    ( b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧  b^{16, 25}_0 ∧ -p_400) -> ( b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0)
c  in CNF:
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨  b^{16, 26}_2
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨  b^{16, 26}_1
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨  p_400 ∨ -b^{16, 26}_0
c  in DIMACS:
-12821  12822 -12823  400  12824 0
-12821  12822 -12823  400  12825 0
-12821  12822 -12823  400 -12826 0

c  -2-1 --> break 
c    ( b^{16, 25}_2 ∧  b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨  b^{16, 25}_0 ∨  p_400 ∨ break
c  in DIMACS:
-12821 -12822  12823  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 25}_2 ∧ -b^{16, 25}_1 ∧ -b^{16, 25}_0 ∧ true) 
c  in CNF:
c    -b^{16, 25}_2 ∨  b^{16, 25}_1 ∨  b^{16, 25}_0 ∨ false 
c  in DIMACS:
-12821  12822  12823  0

c  3 does not represent an automaton state.
c    -(-b^{16, 25}_2 ∧  b^{16, 25}_1 ∧  b^{16, 25}_0 ∧ true) 
c  in CNF:
c     b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ false 
c  in DIMACS:
 12821 -12822 -12823  0
c  -3 does not represent an automaton state.
c    -( b^{16, 25}_2 ∧  b^{16, 25}_1 ∧  b^{16, 25}_0 ∧ true) 
c  in CNF:
c    -b^{16, 25}_2 ∨ -b^{16, 25}_1 ∨ -b^{16, 25}_0 ∨ false 
c  in DIMACS:
-12821 -12822 -12823  0

c i = 26
c  -2+1 --> -1
c    ( b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧  p_416) -> ( b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0)
c  in CNF:
c    -b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨  b^{16, 27}_2
c    -b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_1
c    -b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨  b^{16, 27}_0
c  in DIMACS:
-12824 -12825  12826 -416  12827 0
-12824 -12825  12826 -416 -12828 0
-12824 -12825  12826 -416  12829 0

c  -1+1 --> 0
c    ( b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0 ∧  p_416) -> (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧ -b^{16, 27}_0)
c  in CNF:
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_2
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_1
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_0
c  in DIMACS:
-12824  12825 -12826 -416 -12827 0
-12824  12825 -12826 -416 -12828 0
-12824  12825 -12826 -416 -12829 0

c  0+1 --> 1
c    (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧  p_416) -> (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0)
c  in CNF:
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_2
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_1
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨  b^{16, 27}_0
c  in DIMACS:
 12824  12825  12826 -416 -12827 0
 12824  12825  12826 -416 -12828 0
 12824  12825  12826 -416  12829 0

c  1+1 --> 2
c    (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0 ∧  p_416) -> (-b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0)
c  in CNF:
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_2
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨  b^{16, 27}_1
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ -p_416 ∨ -b^{16, 27}_0
c  in DIMACS:
 12824  12825 -12826 -416 -12827 0
 12824  12825 -12826 -416  12828 0
 12824  12825 -12826 -416 -12829 0

c  2+1 --> break 
c    (-b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧  p_416) -> break
c  in CNF:
c     b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 12824 -12825  12826 -416 1162 0


c  2-1 --> 1
c    (-b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧ -p_416) -> (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0)
c  in CNF:
c     b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_2
c     b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_1
c     b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨  b^{16, 27}_0
c  in DIMACS:
 12824 -12825  12826  416 -12827 0
 12824 -12825  12826  416 -12828 0
 12824 -12825  12826  416  12829 0

c  1-1 --> 0
c    (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0 ∧ -p_416) -> (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧ -b^{16, 27}_0)
c  in CNF:
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_2
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_1
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_0
c  in DIMACS:
 12824  12825 -12826  416 -12827 0
 12824  12825 -12826  416 -12828 0
 12824  12825 -12826  416 -12829 0

c  0-1 --> -1
c    (-b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧ -p_416) -> ( b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0)
c  in CNF:
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨  b^{16, 27}_2
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_1
c     b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨  b^{16, 27}_0
c  in DIMACS:
 12824  12825  12826  416  12827 0
 12824  12825  12826  416 -12828 0
 12824  12825  12826  416  12829 0

c  -1-1 --> -2
c    ( b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧  b^{16, 26}_0 ∧ -p_416) -> ( b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0)
c  in CNF:
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨  b^{16, 27}_2
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨  b^{16, 27}_1
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨  p_416 ∨ -b^{16, 27}_0
c  in DIMACS:
-12824  12825 -12826  416  12827 0
-12824  12825 -12826  416  12828 0
-12824  12825 -12826  416 -12829 0

c  -2-1 --> break 
c    ( b^{16, 26}_2 ∧  b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨  b^{16, 26}_0 ∨  p_416 ∨ break
c  in DIMACS:
-12824 -12825  12826  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 26}_2 ∧ -b^{16, 26}_1 ∧ -b^{16, 26}_0 ∧ true) 
c  in CNF:
c    -b^{16, 26}_2 ∨  b^{16, 26}_1 ∨  b^{16, 26}_0 ∨ false 
c  in DIMACS:
-12824  12825  12826  0

c  3 does not represent an automaton state.
c    -(-b^{16, 26}_2 ∧  b^{16, 26}_1 ∧  b^{16, 26}_0 ∧ true) 
c  in CNF:
c     b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ false 
c  in DIMACS:
 12824 -12825 -12826  0
c  -3 does not represent an automaton state.
c    -( b^{16, 26}_2 ∧  b^{16, 26}_1 ∧  b^{16, 26}_0 ∧ true) 
c  in CNF:
c    -b^{16, 26}_2 ∨ -b^{16, 26}_1 ∨ -b^{16, 26}_0 ∨ false 
c  in DIMACS:
-12824 -12825 -12826  0

c i = 27
c  -2+1 --> -1
c    ( b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧  p_432) -> ( b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0)
c  in CNF:
c    -b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨  b^{16, 28}_2
c    -b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_1
c    -b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨  b^{16, 28}_0
c  in DIMACS:
-12827 -12828  12829 -432  12830 0
-12827 -12828  12829 -432 -12831 0
-12827 -12828  12829 -432  12832 0

c  -1+1 --> 0
c    ( b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0 ∧  p_432) -> (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧ -b^{16, 28}_0)
c  in CNF:
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_2
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_1
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_0
c  in DIMACS:
-12827  12828 -12829 -432 -12830 0
-12827  12828 -12829 -432 -12831 0
-12827  12828 -12829 -432 -12832 0

c  0+1 --> 1
c    (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧  p_432) -> (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0)
c  in CNF:
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_2
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_1
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨  b^{16, 28}_0
c  in DIMACS:
 12827  12828  12829 -432 -12830 0
 12827  12828  12829 -432 -12831 0
 12827  12828  12829 -432  12832 0

c  1+1 --> 2
c    (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0 ∧  p_432) -> (-b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0)
c  in CNF:
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_2
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨  b^{16, 28}_1
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ -p_432 ∨ -b^{16, 28}_0
c  in DIMACS:
 12827  12828 -12829 -432 -12830 0
 12827  12828 -12829 -432  12831 0
 12827  12828 -12829 -432 -12832 0

c  2+1 --> break 
c    (-b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧  p_432) -> break
c  in CNF:
c     b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 12827 -12828  12829 -432 1162 0


c  2-1 --> 1
c    (-b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧ -p_432) -> (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0)
c  in CNF:
c     b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_2
c     b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_1
c     b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨  b^{16, 28}_0
c  in DIMACS:
 12827 -12828  12829  432 -12830 0
 12827 -12828  12829  432 -12831 0
 12827 -12828  12829  432  12832 0

c  1-1 --> 0
c    (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0 ∧ -p_432) -> (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧ -b^{16, 28}_0)
c  in CNF:
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_2
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_1
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_0
c  in DIMACS:
 12827  12828 -12829  432 -12830 0
 12827  12828 -12829  432 -12831 0
 12827  12828 -12829  432 -12832 0

c  0-1 --> -1
c    (-b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧ -p_432) -> ( b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0)
c  in CNF:
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨  b^{16, 28}_2
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_1
c     b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨  b^{16, 28}_0
c  in DIMACS:
 12827  12828  12829  432  12830 0
 12827  12828  12829  432 -12831 0
 12827  12828  12829  432  12832 0

c  -1-1 --> -2
c    ( b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧  b^{16, 27}_0 ∧ -p_432) -> ( b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0)
c  in CNF:
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨  b^{16, 28}_2
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨  b^{16, 28}_1
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨  p_432 ∨ -b^{16, 28}_0
c  in DIMACS:
-12827  12828 -12829  432  12830 0
-12827  12828 -12829  432  12831 0
-12827  12828 -12829  432 -12832 0

c  -2-1 --> break 
c    ( b^{16, 27}_2 ∧  b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨  b^{16, 27}_0 ∨  p_432 ∨ break
c  in DIMACS:
-12827 -12828  12829  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 27}_2 ∧ -b^{16, 27}_1 ∧ -b^{16, 27}_0 ∧ true) 
c  in CNF:
c    -b^{16, 27}_2 ∨  b^{16, 27}_1 ∨  b^{16, 27}_0 ∨ false 
c  in DIMACS:
-12827  12828  12829  0

c  3 does not represent an automaton state.
c    -(-b^{16, 27}_2 ∧  b^{16, 27}_1 ∧  b^{16, 27}_0 ∧ true) 
c  in CNF:
c     b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ false 
c  in DIMACS:
 12827 -12828 -12829  0
c  -3 does not represent an automaton state.
c    -( b^{16, 27}_2 ∧  b^{16, 27}_1 ∧  b^{16, 27}_0 ∧ true) 
c  in CNF:
c    -b^{16, 27}_2 ∨ -b^{16, 27}_1 ∨ -b^{16, 27}_0 ∨ false 
c  in DIMACS:
-12827 -12828 -12829  0

c i = 28
c  -2+1 --> -1
c    ( b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧  p_448) -> ( b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0)
c  in CNF:
c    -b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨  b^{16, 29}_2
c    -b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_1
c    -b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨  b^{16, 29}_0
c  in DIMACS:
-12830 -12831  12832 -448  12833 0
-12830 -12831  12832 -448 -12834 0
-12830 -12831  12832 -448  12835 0

c  -1+1 --> 0
c    ( b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0 ∧  p_448) -> (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧ -b^{16, 29}_0)
c  in CNF:
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_2
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_1
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_0
c  in DIMACS:
-12830  12831 -12832 -448 -12833 0
-12830  12831 -12832 -448 -12834 0
-12830  12831 -12832 -448 -12835 0

c  0+1 --> 1
c    (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧  p_448) -> (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0)
c  in CNF:
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_2
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_1
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨  b^{16, 29}_0
c  in DIMACS:
 12830  12831  12832 -448 -12833 0
 12830  12831  12832 -448 -12834 0
 12830  12831  12832 -448  12835 0

c  1+1 --> 2
c    (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0 ∧  p_448) -> (-b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0)
c  in CNF:
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_2
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨  b^{16, 29}_1
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ -p_448 ∨ -b^{16, 29}_0
c  in DIMACS:
 12830  12831 -12832 -448 -12833 0
 12830  12831 -12832 -448  12834 0
 12830  12831 -12832 -448 -12835 0

c  2+1 --> break 
c    (-b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧  p_448) -> break
c  in CNF:
c     b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 12830 -12831  12832 -448 1162 0


c  2-1 --> 1
c    (-b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧ -p_448) -> (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0)
c  in CNF:
c     b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_2
c     b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_1
c     b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨  b^{16, 29}_0
c  in DIMACS:
 12830 -12831  12832  448 -12833 0
 12830 -12831  12832  448 -12834 0
 12830 -12831  12832  448  12835 0

c  1-1 --> 0
c    (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0 ∧ -p_448) -> (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧ -b^{16, 29}_0)
c  in CNF:
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_2
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_1
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_0
c  in DIMACS:
 12830  12831 -12832  448 -12833 0
 12830  12831 -12832  448 -12834 0
 12830  12831 -12832  448 -12835 0

c  0-1 --> -1
c    (-b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧ -p_448) -> ( b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0)
c  in CNF:
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨  b^{16, 29}_2
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_1
c     b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨  b^{16, 29}_0
c  in DIMACS:
 12830  12831  12832  448  12833 0
 12830  12831  12832  448 -12834 0
 12830  12831  12832  448  12835 0

c  -1-1 --> -2
c    ( b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧  b^{16, 28}_0 ∧ -p_448) -> ( b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0)
c  in CNF:
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨  b^{16, 29}_2
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨  b^{16, 29}_1
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨  p_448 ∨ -b^{16, 29}_0
c  in DIMACS:
-12830  12831 -12832  448  12833 0
-12830  12831 -12832  448  12834 0
-12830  12831 -12832  448 -12835 0

c  -2-1 --> break 
c    ( b^{16, 28}_2 ∧  b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨  b^{16, 28}_0 ∨  p_448 ∨ break
c  in DIMACS:
-12830 -12831  12832  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 28}_2 ∧ -b^{16, 28}_1 ∧ -b^{16, 28}_0 ∧ true) 
c  in CNF:
c    -b^{16, 28}_2 ∨  b^{16, 28}_1 ∨  b^{16, 28}_0 ∨ false 
c  in DIMACS:
-12830  12831  12832  0

c  3 does not represent an automaton state.
c    -(-b^{16, 28}_2 ∧  b^{16, 28}_1 ∧  b^{16, 28}_0 ∧ true) 
c  in CNF:
c     b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ false 
c  in DIMACS:
 12830 -12831 -12832  0
c  -3 does not represent an automaton state.
c    -( b^{16, 28}_2 ∧  b^{16, 28}_1 ∧  b^{16, 28}_0 ∧ true) 
c  in CNF:
c    -b^{16, 28}_2 ∨ -b^{16, 28}_1 ∨ -b^{16, 28}_0 ∨ false 
c  in DIMACS:
-12830 -12831 -12832  0

c i = 29
c  -2+1 --> -1
c    ( b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧  p_464) -> ( b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0)
c  in CNF:
c    -b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨  b^{16, 30}_2
c    -b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_1
c    -b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨  b^{16, 30}_0
c  in DIMACS:
-12833 -12834  12835 -464  12836 0
-12833 -12834  12835 -464 -12837 0
-12833 -12834  12835 -464  12838 0

c  -1+1 --> 0
c    ( b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0 ∧  p_464) -> (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧ -b^{16, 30}_0)
c  in CNF:
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_2
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_1
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_0
c  in DIMACS:
-12833  12834 -12835 -464 -12836 0
-12833  12834 -12835 -464 -12837 0
-12833  12834 -12835 -464 -12838 0

c  0+1 --> 1
c    (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧  p_464) -> (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0)
c  in CNF:
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_2
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_1
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨  b^{16, 30}_0
c  in DIMACS:
 12833  12834  12835 -464 -12836 0
 12833  12834  12835 -464 -12837 0
 12833  12834  12835 -464  12838 0

c  1+1 --> 2
c    (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0 ∧  p_464) -> (-b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0)
c  in CNF:
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_2
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨  b^{16, 30}_1
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ -p_464 ∨ -b^{16, 30}_0
c  in DIMACS:
 12833  12834 -12835 -464 -12836 0
 12833  12834 -12835 -464  12837 0
 12833  12834 -12835 -464 -12838 0

c  2+1 --> break 
c    (-b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧  p_464) -> break
c  in CNF:
c     b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 12833 -12834  12835 -464 1162 0


c  2-1 --> 1
c    (-b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧ -p_464) -> (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0)
c  in CNF:
c     b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_2
c     b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_1
c     b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨  b^{16, 30}_0
c  in DIMACS:
 12833 -12834  12835  464 -12836 0
 12833 -12834  12835  464 -12837 0
 12833 -12834  12835  464  12838 0

c  1-1 --> 0
c    (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0 ∧ -p_464) -> (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧ -b^{16, 30}_0)
c  in CNF:
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_2
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_1
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_0
c  in DIMACS:
 12833  12834 -12835  464 -12836 0
 12833  12834 -12835  464 -12837 0
 12833  12834 -12835  464 -12838 0

c  0-1 --> -1
c    (-b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧ -p_464) -> ( b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0)
c  in CNF:
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨  b^{16, 30}_2
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_1
c     b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨  b^{16, 30}_0
c  in DIMACS:
 12833  12834  12835  464  12836 0
 12833  12834  12835  464 -12837 0
 12833  12834  12835  464  12838 0

c  -1-1 --> -2
c    ( b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧  b^{16, 29}_0 ∧ -p_464) -> ( b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0)
c  in CNF:
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨  b^{16, 30}_2
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨  b^{16, 30}_1
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨  p_464 ∨ -b^{16, 30}_0
c  in DIMACS:
-12833  12834 -12835  464  12836 0
-12833  12834 -12835  464  12837 0
-12833  12834 -12835  464 -12838 0

c  -2-1 --> break 
c    ( b^{16, 29}_2 ∧  b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨  b^{16, 29}_0 ∨  p_464 ∨ break
c  in DIMACS:
-12833 -12834  12835  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 29}_2 ∧ -b^{16, 29}_1 ∧ -b^{16, 29}_0 ∧ true) 
c  in CNF:
c    -b^{16, 29}_2 ∨  b^{16, 29}_1 ∨  b^{16, 29}_0 ∨ false 
c  in DIMACS:
-12833  12834  12835  0

c  3 does not represent an automaton state.
c    -(-b^{16, 29}_2 ∧  b^{16, 29}_1 ∧  b^{16, 29}_0 ∧ true) 
c  in CNF:
c     b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ false 
c  in DIMACS:
 12833 -12834 -12835  0
c  -3 does not represent an automaton state.
c    -( b^{16, 29}_2 ∧  b^{16, 29}_1 ∧  b^{16, 29}_0 ∧ true) 
c  in CNF:
c    -b^{16, 29}_2 ∨ -b^{16, 29}_1 ∨ -b^{16, 29}_0 ∨ false 
c  in DIMACS:
-12833 -12834 -12835  0

c i = 30
c  -2+1 --> -1
c    ( b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧  p_480) -> ( b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0)
c  in CNF:
c    -b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨  b^{16, 31}_2
c    -b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_1
c    -b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨  b^{16, 31}_0
c  in DIMACS:
-12836 -12837  12838 -480  12839 0
-12836 -12837  12838 -480 -12840 0
-12836 -12837  12838 -480  12841 0

c  -1+1 --> 0
c    ( b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0 ∧  p_480) -> (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧ -b^{16, 31}_0)
c  in CNF:
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_2
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_1
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_0
c  in DIMACS:
-12836  12837 -12838 -480 -12839 0
-12836  12837 -12838 -480 -12840 0
-12836  12837 -12838 -480 -12841 0

c  0+1 --> 1
c    (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧  p_480) -> (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0)
c  in CNF:
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_2
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_1
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨  b^{16, 31}_0
c  in DIMACS:
 12836  12837  12838 -480 -12839 0
 12836  12837  12838 -480 -12840 0
 12836  12837  12838 -480  12841 0

c  1+1 --> 2
c    (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0 ∧  p_480) -> (-b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0)
c  in CNF:
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_2
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨  b^{16, 31}_1
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ -p_480 ∨ -b^{16, 31}_0
c  in DIMACS:
 12836  12837 -12838 -480 -12839 0
 12836  12837 -12838 -480  12840 0
 12836  12837 -12838 -480 -12841 0

c  2+1 --> break 
c    (-b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧  p_480) -> break
c  in CNF:
c     b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 12836 -12837  12838 -480 1162 0


c  2-1 --> 1
c    (-b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧ -p_480) -> (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0)
c  in CNF:
c     b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_2
c     b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_1
c     b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨  b^{16, 31}_0
c  in DIMACS:
 12836 -12837  12838  480 -12839 0
 12836 -12837  12838  480 -12840 0
 12836 -12837  12838  480  12841 0

c  1-1 --> 0
c    (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0 ∧ -p_480) -> (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧ -b^{16, 31}_0)
c  in CNF:
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_2
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_1
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_0
c  in DIMACS:
 12836  12837 -12838  480 -12839 0
 12836  12837 -12838  480 -12840 0
 12836  12837 -12838  480 -12841 0

c  0-1 --> -1
c    (-b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧ -p_480) -> ( b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0)
c  in CNF:
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨  b^{16, 31}_2
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_1
c     b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨  b^{16, 31}_0
c  in DIMACS:
 12836  12837  12838  480  12839 0
 12836  12837  12838  480 -12840 0
 12836  12837  12838  480  12841 0

c  -1-1 --> -2
c    ( b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧  b^{16, 30}_0 ∧ -p_480) -> ( b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0)
c  in CNF:
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨  b^{16, 31}_2
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨  b^{16, 31}_1
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨  p_480 ∨ -b^{16, 31}_0
c  in DIMACS:
-12836  12837 -12838  480  12839 0
-12836  12837 -12838  480  12840 0
-12836  12837 -12838  480 -12841 0

c  -2-1 --> break 
c    ( b^{16, 30}_2 ∧  b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨  b^{16, 30}_0 ∨  p_480 ∨ break
c  in DIMACS:
-12836 -12837  12838  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 30}_2 ∧ -b^{16, 30}_1 ∧ -b^{16, 30}_0 ∧ true) 
c  in CNF:
c    -b^{16, 30}_2 ∨  b^{16, 30}_1 ∨  b^{16, 30}_0 ∨ false 
c  in DIMACS:
-12836  12837  12838  0

c  3 does not represent an automaton state.
c    -(-b^{16, 30}_2 ∧  b^{16, 30}_1 ∧  b^{16, 30}_0 ∧ true) 
c  in CNF:
c     b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ false 
c  in DIMACS:
 12836 -12837 -12838  0
c  -3 does not represent an automaton state.
c    -( b^{16, 30}_2 ∧  b^{16, 30}_1 ∧  b^{16, 30}_0 ∧ true) 
c  in CNF:
c    -b^{16, 30}_2 ∨ -b^{16, 30}_1 ∨ -b^{16, 30}_0 ∨ false 
c  in DIMACS:
-12836 -12837 -12838  0

c i = 31
c  -2+1 --> -1
c    ( b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧  p_496) -> ( b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0)
c  in CNF:
c    -b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨  b^{16, 32}_2
c    -b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_1
c    -b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨  b^{16, 32}_0
c  in DIMACS:
-12839 -12840  12841 -496  12842 0
-12839 -12840  12841 -496 -12843 0
-12839 -12840  12841 -496  12844 0

c  -1+1 --> 0
c    ( b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0 ∧  p_496) -> (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧ -b^{16, 32}_0)
c  in CNF:
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_2
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_1
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_0
c  in DIMACS:
-12839  12840 -12841 -496 -12842 0
-12839  12840 -12841 -496 -12843 0
-12839  12840 -12841 -496 -12844 0

c  0+1 --> 1
c    (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧  p_496) -> (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0)
c  in CNF:
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_2
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_1
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨  b^{16, 32}_0
c  in DIMACS:
 12839  12840  12841 -496 -12842 0
 12839  12840  12841 -496 -12843 0
 12839  12840  12841 -496  12844 0

c  1+1 --> 2
c    (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0 ∧  p_496) -> (-b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0)
c  in CNF:
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_2
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨  b^{16, 32}_1
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ -p_496 ∨ -b^{16, 32}_0
c  in DIMACS:
 12839  12840 -12841 -496 -12842 0
 12839  12840 -12841 -496  12843 0
 12839  12840 -12841 -496 -12844 0

c  2+1 --> break 
c    (-b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧  p_496) -> break
c  in CNF:
c     b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 12839 -12840  12841 -496 1162 0


c  2-1 --> 1
c    (-b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧ -p_496) -> (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0)
c  in CNF:
c     b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_2
c     b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_1
c     b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨  b^{16, 32}_0
c  in DIMACS:
 12839 -12840  12841  496 -12842 0
 12839 -12840  12841  496 -12843 0
 12839 -12840  12841  496  12844 0

c  1-1 --> 0
c    (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0 ∧ -p_496) -> (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧ -b^{16, 32}_0)
c  in CNF:
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_2
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_1
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_0
c  in DIMACS:
 12839  12840 -12841  496 -12842 0
 12839  12840 -12841  496 -12843 0
 12839  12840 -12841  496 -12844 0

c  0-1 --> -1
c    (-b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧ -p_496) -> ( b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0)
c  in CNF:
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨  b^{16, 32}_2
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_1
c     b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨  b^{16, 32}_0
c  in DIMACS:
 12839  12840  12841  496  12842 0
 12839  12840  12841  496 -12843 0
 12839  12840  12841  496  12844 0

c  -1-1 --> -2
c    ( b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧  b^{16, 31}_0 ∧ -p_496) -> ( b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0)
c  in CNF:
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨  b^{16, 32}_2
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨  b^{16, 32}_1
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨  p_496 ∨ -b^{16, 32}_0
c  in DIMACS:
-12839  12840 -12841  496  12842 0
-12839  12840 -12841  496  12843 0
-12839  12840 -12841  496 -12844 0

c  -2-1 --> break 
c    ( b^{16, 31}_2 ∧  b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨  b^{16, 31}_0 ∨  p_496 ∨ break
c  in DIMACS:
-12839 -12840  12841  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 31}_2 ∧ -b^{16, 31}_1 ∧ -b^{16, 31}_0 ∧ true) 
c  in CNF:
c    -b^{16, 31}_2 ∨  b^{16, 31}_1 ∨  b^{16, 31}_0 ∨ false 
c  in DIMACS:
-12839  12840  12841  0

c  3 does not represent an automaton state.
c    -(-b^{16, 31}_2 ∧  b^{16, 31}_1 ∧  b^{16, 31}_0 ∧ true) 
c  in CNF:
c     b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ false 
c  in DIMACS:
 12839 -12840 -12841  0
c  -3 does not represent an automaton state.
c    -( b^{16, 31}_2 ∧  b^{16, 31}_1 ∧  b^{16, 31}_0 ∧ true) 
c  in CNF:
c    -b^{16, 31}_2 ∨ -b^{16, 31}_1 ∨ -b^{16, 31}_0 ∨ false 
c  in DIMACS:
-12839 -12840 -12841  0

c i = 32
c  -2+1 --> -1
c    ( b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧  p_512) -> ( b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0)
c  in CNF:
c    -b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨  b^{16, 33}_2
c    -b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_1
c    -b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨  b^{16, 33}_0
c  in DIMACS:
-12842 -12843  12844 -512  12845 0
-12842 -12843  12844 -512 -12846 0
-12842 -12843  12844 -512  12847 0

c  -1+1 --> 0
c    ( b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0 ∧  p_512) -> (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧ -b^{16, 33}_0)
c  in CNF:
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_2
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_1
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_0
c  in DIMACS:
-12842  12843 -12844 -512 -12845 0
-12842  12843 -12844 -512 -12846 0
-12842  12843 -12844 -512 -12847 0

c  0+1 --> 1
c    (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧  p_512) -> (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0)
c  in CNF:
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_2
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_1
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨  b^{16, 33}_0
c  in DIMACS:
 12842  12843  12844 -512 -12845 0
 12842  12843  12844 -512 -12846 0
 12842  12843  12844 -512  12847 0

c  1+1 --> 2
c    (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0 ∧  p_512) -> (-b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0)
c  in CNF:
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_2
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨  b^{16, 33}_1
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ -p_512 ∨ -b^{16, 33}_0
c  in DIMACS:
 12842  12843 -12844 -512 -12845 0
 12842  12843 -12844 -512  12846 0
 12842  12843 -12844 -512 -12847 0

c  2+1 --> break 
c    (-b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧  p_512) -> break
c  in CNF:
c     b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 12842 -12843  12844 -512 1162 0


c  2-1 --> 1
c    (-b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧ -p_512) -> (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0)
c  in CNF:
c     b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_2
c     b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_1
c     b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨  b^{16, 33}_0
c  in DIMACS:
 12842 -12843  12844  512 -12845 0
 12842 -12843  12844  512 -12846 0
 12842 -12843  12844  512  12847 0

c  1-1 --> 0
c    (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0 ∧ -p_512) -> (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧ -b^{16, 33}_0)
c  in CNF:
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_2
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_1
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_0
c  in DIMACS:
 12842  12843 -12844  512 -12845 0
 12842  12843 -12844  512 -12846 0
 12842  12843 -12844  512 -12847 0

c  0-1 --> -1
c    (-b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧ -p_512) -> ( b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0)
c  in CNF:
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨  b^{16, 33}_2
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_1
c     b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨  b^{16, 33}_0
c  in DIMACS:
 12842  12843  12844  512  12845 0
 12842  12843  12844  512 -12846 0
 12842  12843  12844  512  12847 0

c  -1-1 --> -2
c    ( b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧  b^{16, 32}_0 ∧ -p_512) -> ( b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0)
c  in CNF:
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨  b^{16, 33}_2
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨  b^{16, 33}_1
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨  p_512 ∨ -b^{16, 33}_0
c  in DIMACS:
-12842  12843 -12844  512  12845 0
-12842  12843 -12844  512  12846 0
-12842  12843 -12844  512 -12847 0

c  -2-1 --> break 
c    ( b^{16, 32}_2 ∧  b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨  b^{16, 32}_0 ∨  p_512 ∨ break
c  in DIMACS:
-12842 -12843  12844  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 32}_2 ∧ -b^{16, 32}_1 ∧ -b^{16, 32}_0 ∧ true) 
c  in CNF:
c    -b^{16, 32}_2 ∨  b^{16, 32}_1 ∨  b^{16, 32}_0 ∨ false 
c  in DIMACS:
-12842  12843  12844  0

c  3 does not represent an automaton state.
c    -(-b^{16, 32}_2 ∧  b^{16, 32}_1 ∧  b^{16, 32}_0 ∧ true) 
c  in CNF:
c     b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ false 
c  in DIMACS:
 12842 -12843 -12844  0
c  -3 does not represent an automaton state.
c    -( b^{16, 32}_2 ∧  b^{16, 32}_1 ∧  b^{16, 32}_0 ∧ true) 
c  in CNF:
c    -b^{16, 32}_2 ∨ -b^{16, 32}_1 ∨ -b^{16, 32}_0 ∨ false 
c  in DIMACS:
-12842 -12843 -12844  0

c i = 33
c  -2+1 --> -1
c    ( b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧  p_528) -> ( b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0)
c  in CNF:
c    -b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨  b^{16, 34}_2
c    -b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_1
c    -b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨  b^{16, 34}_0
c  in DIMACS:
-12845 -12846  12847 -528  12848 0
-12845 -12846  12847 -528 -12849 0
-12845 -12846  12847 -528  12850 0

c  -1+1 --> 0
c    ( b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0 ∧  p_528) -> (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧ -b^{16, 34}_0)
c  in CNF:
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_2
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_1
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_0
c  in DIMACS:
-12845  12846 -12847 -528 -12848 0
-12845  12846 -12847 -528 -12849 0
-12845  12846 -12847 -528 -12850 0

c  0+1 --> 1
c    (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧  p_528) -> (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0)
c  in CNF:
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_2
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_1
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨  b^{16, 34}_0
c  in DIMACS:
 12845  12846  12847 -528 -12848 0
 12845  12846  12847 -528 -12849 0
 12845  12846  12847 -528  12850 0

c  1+1 --> 2
c    (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0 ∧  p_528) -> (-b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0)
c  in CNF:
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_2
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨  b^{16, 34}_1
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ -p_528 ∨ -b^{16, 34}_0
c  in DIMACS:
 12845  12846 -12847 -528 -12848 0
 12845  12846 -12847 -528  12849 0
 12845  12846 -12847 -528 -12850 0

c  2+1 --> break 
c    (-b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧  p_528) -> break
c  in CNF:
c     b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 12845 -12846  12847 -528 1162 0


c  2-1 --> 1
c    (-b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧ -p_528) -> (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0)
c  in CNF:
c     b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_2
c     b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_1
c     b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨  b^{16, 34}_0
c  in DIMACS:
 12845 -12846  12847  528 -12848 0
 12845 -12846  12847  528 -12849 0
 12845 -12846  12847  528  12850 0

c  1-1 --> 0
c    (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0 ∧ -p_528) -> (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧ -b^{16, 34}_0)
c  in CNF:
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_2
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_1
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_0
c  in DIMACS:
 12845  12846 -12847  528 -12848 0
 12845  12846 -12847  528 -12849 0
 12845  12846 -12847  528 -12850 0

c  0-1 --> -1
c    (-b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧ -p_528) -> ( b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0)
c  in CNF:
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨  b^{16, 34}_2
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_1
c     b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨  b^{16, 34}_0
c  in DIMACS:
 12845  12846  12847  528  12848 0
 12845  12846  12847  528 -12849 0
 12845  12846  12847  528  12850 0

c  -1-1 --> -2
c    ( b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧  b^{16, 33}_0 ∧ -p_528) -> ( b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0)
c  in CNF:
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨  b^{16, 34}_2
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨  b^{16, 34}_1
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨  p_528 ∨ -b^{16, 34}_0
c  in DIMACS:
-12845  12846 -12847  528  12848 0
-12845  12846 -12847  528  12849 0
-12845  12846 -12847  528 -12850 0

c  -2-1 --> break 
c    ( b^{16, 33}_2 ∧  b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨  b^{16, 33}_0 ∨  p_528 ∨ break
c  in DIMACS:
-12845 -12846  12847  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 33}_2 ∧ -b^{16, 33}_1 ∧ -b^{16, 33}_0 ∧ true) 
c  in CNF:
c    -b^{16, 33}_2 ∨  b^{16, 33}_1 ∨  b^{16, 33}_0 ∨ false 
c  in DIMACS:
-12845  12846  12847  0

c  3 does not represent an automaton state.
c    -(-b^{16, 33}_2 ∧  b^{16, 33}_1 ∧  b^{16, 33}_0 ∧ true) 
c  in CNF:
c     b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ false 
c  in DIMACS:
 12845 -12846 -12847  0
c  -3 does not represent an automaton state.
c    -( b^{16, 33}_2 ∧  b^{16, 33}_1 ∧  b^{16, 33}_0 ∧ true) 
c  in CNF:
c    -b^{16, 33}_2 ∨ -b^{16, 33}_1 ∨ -b^{16, 33}_0 ∨ false 
c  in DIMACS:
-12845 -12846 -12847  0

c i = 34
c  -2+1 --> -1
c    ( b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧  p_544) -> ( b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0)
c  in CNF:
c    -b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨  b^{16, 35}_2
c    -b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_1
c    -b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨  b^{16, 35}_0
c  in DIMACS:
-12848 -12849  12850 -544  12851 0
-12848 -12849  12850 -544 -12852 0
-12848 -12849  12850 -544  12853 0

c  -1+1 --> 0
c    ( b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0 ∧  p_544) -> (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧ -b^{16, 35}_0)
c  in CNF:
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_2
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_1
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_0
c  in DIMACS:
-12848  12849 -12850 -544 -12851 0
-12848  12849 -12850 -544 -12852 0
-12848  12849 -12850 -544 -12853 0

c  0+1 --> 1
c    (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧  p_544) -> (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0)
c  in CNF:
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_2
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_1
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨  b^{16, 35}_0
c  in DIMACS:
 12848  12849  12850 -544 -12851 0
 12848  12849  12850 -544 -12852 0
 12848  12849  12850 -544  12853 0

c  1+1 --> 2
c    (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0 ∧  p_544) -> (-b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0)
c  in CNF:
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_2
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨  b^{16, 35}_1
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ -p_544 ∨ -b^{16, 35}_0
c  in DIMACS:
 12848  12849 -12850 -544 -12851 0
 12848  12849 -12850 -544  12852 0
 12848  12849 -12850 -544 -12853 0

c  2+1 --> break 
c    (-b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧  p_544) -> break
c  in CNF:
c     b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 12848 -12849  12850 -544 1162 0


c  2-1 --> 1
c    (-b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧ -p_544) -> (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0)
c  in CNF:
c     b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_2
c     b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_1
c     b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨  b^{16, 35}_0
c  in DIMACS:
 12848 -12849  12850  544 -12851 0
 12848 -12849  12850  544 -12852 0
 12848 -12849  12850  544  12853 0

c  1-1 --> 0
c    (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0 ∧ -p_544) -> (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧ -b^{16, 35}_0)
c  in CNF:
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_2
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_1
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_0
c  in DIMACS:
 12848  12849 -12850  544 -12851 0
 12848  12849 -12850  544 -12852 0
 12848  12849 -12850  544 -12853 0

c  0-1 --> -1
c    (-b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧ -p_544) -> ( b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0)
c  in CNF:
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨  b^{16, 35}_2
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_1
c     b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨  b^{16, 35}_0
c  in DIMACS:
 12848  12849  12850  544  12851 0
 12848  12849  12850  544 -12852 0
 12848  12849  12850  544  12853 0

c  -1-1 --> -2
c    ( b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧  b^{16, 34}_0 ∧ -p_544) -> ( b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0)
c  in CNF:
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨  b^{16, 35}_2
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨  b^{16, 35}_1
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨  p_544 ∨ -b^{16, 35}_0
c  in DIMACS:
-12848  12849 -12850  544  12851 0
-12848  12849 -12850  544  12852 0
-12848  12849 -12850  544 -12853 0

c  -2-1 --> break 
c    ( b^{16, 34}_2 ∧  b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨  b^{16, 34}_0 ∨  p_544 ∨ break
c  in DIMACS:
-12848 -12849  12850  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 34}_2 ∧ -b^{16, 34}_1 ∧ -b^{16, 34}_0 ∧ true) 
c  in CNF:
c    -b^{16, 34}_2 ∨  b^{16, 34}_1 ∨  b^{16, 34}_0 ∨ false 
c  in DIMACS:
-12848  12849  12850  0

c  3 does not represent an automaton state.
c    -(-b^{16, 34}_2 ∧  b^{16, 34}_1 ∧  b^{16, 34}_0 ∧ true) 
c  in CNF:
c     b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ false 
c  in DIMACS:
 12848 -12849 -12850  0
c  -3 does not represent an automaton state.
c    -( b^{16, 34}_2 ∧  b^{16, 34}_1 ∧  b^{16, 34}_0 ∧ true) 
c  in CNF:
c    -b^{16, 34}_2 ∨ -b^{16, 34}_1 ∨ -b^{16, 34}_0 ∨ false 
c  in DIMACS:
-12848 -12849 -12850  0

c i = 35
c  -2+1 --> -1
c    ( b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧  p_560) -> ( b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0)
c  in CNF:
c    -b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨  b^{16, 36}_2
c    -b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_1
c    -b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨  b^{16, 36}_0
c  in DIMACS:
-12851 -12852  12853 -560  12854 0
-12851 -12852  12853 -560 -12855 0
-12851 -12852  12853 -560  12856 0

c  -1+1 --> 0
c    ( b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0 ∧  p_560) -> (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧ -b^{16, 36}_0)
c  in CNF:
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_2
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_1
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_0
c  in DIMACS:
-12851  12852 -12853 -560 -12854 0
-12851  12852 -12853 -560 -12855 0
-12851  12852 -12853 -560 -12856 0

c  0+1 --> 1
c    (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧  p_560) -> (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0)
c  in CNF:
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_2
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_1
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨  b^{16, 36}_0
c  in DIMACS:
 12851  12852  12853 -560 -12854 0
 12851  12852  12853 -560 -12855 0
 12851  12852  12853 -560  12856 0

c  1+1 --> 2
c    (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0 ∧  p_560) -> (-b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0)
c  in CNF:
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_2
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨  b^{16, 36}_1
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ -p_560 ∨ -b^{16, 36}_0
c  in DIMACS:
 12851  12852 -12853 -560 -12854 0
 12851  12852 -12853 -560  12855 0
 12851  12852 -12853 -560 -12856 0

c  2+1 --> break 
c    (-b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧  p_560) -> break
c  in CNF:
c     b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 12851 -12852  12853 -560 1162 0


c  2-1 --> 1
c    (-b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧ -p_560) -> (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0)
c  in CNF:
c     b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_2
c     b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_1
c     b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨  b^{16, 36}_0
c  in DIMACS:
 12851 -12852  12853  560 -12854 0
 12851 -12852  12853  560 -12855 0
 12851 -12852  12853  560  12856 0

c  1-1 --> 0
c    (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0 ∧ -p_560) -> (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧ -b^{16, 36}_0)
c  in CNF:
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_2
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_1
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_0
c  in DIMACS:
 12851  12852 -12853  560 -12854 0
 12851  12852 -12853  560 -12855 0
 12851  12852 -12853  560 -12856 0

c  0-1 --> -1
c    (-b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧ -p_560) -> ( b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0)
c  in CNF:
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨  b^{16, 36}_2
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_1
c     b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨  b^{16, 36}_0
c  in DIMACS:
 12851  12852  12853  560  12854 0
 12851  12852  12853  560 -12855 0
 12851  12852  12853  560  12856 0

c  -1-1 --> -2
c    ( b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧  b^{16, 35}_0 ∧ -p_560) -> ( b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0)
c  in CNF:
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨  b^{16, 36}_2
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨  b^{16, 36}_1
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨  p_560 ∨ -b^{16, 36}_0
c  in DIMACS:
-12851  12852 -12853  560  12854 0
-12851  12852 -12853  560  12855 0
-12851  12852 -12853  560 -12856 0

c  -2-1 --> break 
c    ( b^{16, 35}_2 ∧  b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨  b^{16, 35}_0 ∨  p_560 ∨ break
c  in DIMACS:
-12851 -12852  12853  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 35}_2 ∧ -b^{16, 35}_1 ∧ -b^{16, 35}_0 ∧ true) 
c  in CNF:
c    -b^{16, 35}_2 ∨  b^{16, 35}_1 ∨  b^{16, 35}_0 ∨ false 
c  in DIMACS:
-12851  12852  12853  0

c  3 does not represent an automaton state.
c    -(-b^{16, 35}_2 ∧  b^{16, 35}_1 ∧  b^{16, 35}_0 ∧ true) 
c  in CNF:
c     b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ false 
c  in DIMACS:
 12851 -12852 -12853  0
c  -3 does not represent an automaton state.
c    -( b^{16, 35}_2 ∧  b^{16, 35}_1 ∧  b^{16, 35}_0 ∧ true) 
c  in CNF:
c    -b^{16, 35}_2 ∨ -b^{16, 35}_1 ∨ -b^{16, 35}_0 ∨ false 
c  in DIMACS:
-12851 -12852 -12853  0

c i = 36
c  -2+1 --> -1
c    ( b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧  p_576) -> ( b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0)
c  in CNF:
c    -b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨  b^{16, 37}_2
c    -b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_1
c    -b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨  b^{16, 37}_0
c  in DIMACS:
-12854 -12855  12856 -576  12857 0
-12854 -12855  12856 -576 -12858 0
-12854 -12855  12856 -576  12859 0

c  -1+1 --> 0
c    ( b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0 ∧  p_576) -> (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧ -b^{16, 37}_0)
c  in CNF:
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_2
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_1
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_0
c  in DIMACS:
-12854  12855 -12856 -576 -12857 0
-12854  12855 -12856 -576 -12858 0
-12854  12855 -12856 -576 -12859 0

c  0+1 --> 1
c    (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧  p_576) -> (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0)
c  in CNF:
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_2
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_1
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨  b^{16, 37}_0
c  in DIMACS:
 12854  12855  12856 -576 -12857 0
 12854  12855  12856 -576 -12858 0
 12854  12855  12856 -576  12859 0

c  1+1 --> 2
c    (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0 ∧  p_576) -> (-b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0)
c  in CNF:
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_2
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨  b^{16, 37}_1
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ -p_576 ∨ -b^{16, 37}_0
c  in DIMACS:
 12854  12855 -12856 -576 -12857 0
 12854  12855 -12856 -576  12858 0
 12854  12855 -12856 -576 -12859 0

c  2+1 --> break 
c    (-b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧  p_576) -> break
c  in CNF:
c     b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 12854 -12855  12856 -576 1162 0


c  2-1 --> 1
c    (-b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧ -p_576) -> (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0)
c  in CNF:
c     b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_2
c     b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_1
c     b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨  b^{16, 37}_0
c  in DIMACS:
 12854 -12855  12856  576 -12857 0
 12854 -12855  12856  576 -12858 0
 12854 -12855  12856  576  12859 0

c  1-1 --> 0
c    (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0 ∧ -p_576) -> (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧ -b^{16, 37}_0)
c  in CNF:
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_2
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_1
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_0
c  in DIMACS:
 12854  12855 -12856  576 -12857 0
 12854  12855 -12856  576 -12858 0
 12854  12855 -12856  576 -12859 0

c  0-1 --> -1
c    (-b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧ -p_576) -> ( b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0)
c  in CNF:
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨  b^{16, 37}_2
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_1
c     b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨  b^{16, 37}_0
c  in DIMACS:
 12854  12855  12856  576  12857 0
 12854  12855  12856  576 -12858 0
 12854  12855  12856  576  12859 0

c  -1-1 --> -2
c    ( b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧  b^{16, 36}_0 ∧ -p_576) -> ( b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0)
c  in CNF:
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨  b^{16, 37}_2
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨  b^{16, 37}_1
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨  p_576 ∨ -b^{16, 37}_0
c  in DIMACS:
-12854  12855 -12856  576  12857 0
-12854  12855 -12856  576  12858 0
-12854  12855 -12856  576 -12859 0

c  -2-1 --> break 
c    ( b^{16, 36}_2 ∧  b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨  b^{16, 36}_0 ∨  p_576 ∨ break
c  in DIMACS:
-12854 -12855  12856  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 36}_2 ∧ -b^{16, 36}_1 ∧ -b^{16, 36}_0 ∧ true) 
c  in CNF:
c    -b^{16, 36}_2 ∨  b^{16, 36}_1 ∨  b^{16, 36}_0 ∨ false 
c  in DIMACS:
-12854  12855  12856  0

c  3 does not represent an automaton state.
c    -(-b^{16, 36}_2 ∧  b^{16, 36}_1 ∧  b^{16, 36}_0 ∧ true) 
c  in CNF:
c     b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ false 
c  in DIMACS:
 12854 -12855 -12856  0
c  -3 does not represent an automaton state.
c    -( b^{16, 36}_2 ∧  b^{16, 36}_1 ∧  b^{16, 36}_0 ∧ true) 
c  in CNF:
c    -b^{16, 36}_2 ∨ -b^{16, 36}_1 ∨ -b^{16, 36}_0 ∨ false 
c  in DIMACS:
-12854 -12855 -12856  0

c i = 37
c  -2+1 --> -1
c    ( b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧  p_592) -> ( b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0)
c  in CNF:
c    -b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨  b^{16, 38}_2
c    -b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_1
c    -b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨  b^{16, 38}_0
c  in DIMACS:
-12857 -12858  12859 -592  12860 0
-12857 -12858  12859 -592 -12861 0
-12857 -12858  12859 -592  12862 0

c  -1+1 --> 0
c    ( b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0 ∧  p_592) -> (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧ -b^{16, 38}_0)
c  in CNF:
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_2
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_1
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_0
c  in DIMACS:
-12857  12858 -12859 -592 -12860 0
-12857  12858 -12859 -592 -12861 0
-12857  12858 -12859 -592 -12862 0

c  0+1 --> 1
c    (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧  p_592) -> (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0)
c  in CNF:
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_2
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_1
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨  b^{16, 38}_0
c  in DIMACS:
 12857  12858  12859 -592 -12860 0
 12857  12858  12859 -592 -12861 0
 12857  12858  12859 -592  12862 0

c  1+1 --> 2
c    (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0 ∧  p_592) -> (-b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0)
c  in CNF:
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_2
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨  b^{16, 38}_1
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ -p_592 ∨ -b^{16, 38}_0
c  in DIMACS:
 12857  12858 -12859 -592 -12860 0
 12857  12858 -12859 -592  12861 0
 12857  12858 -12859 -592 -12862 0

c  2+1 --> break 
c    (-b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧  p_592) -> break
c  in CNF:
c     b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 12857 -12858  12859 -592 1162 0


c  2-1 --> 1
c    (-b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧ -p_592) -> (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0)
c  in CNF:
c     b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_2
c     b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_1
c     b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨  b^{16, 38}_0
c  in DIMACS:
 12857 -12858  12859  592 -12860 0
 12857 -12858  12859  592 -12861 0
 12857 -12858  12859  592  12862 0

c  1-1 --> 0
c    (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0 ∧ -p_592) -> (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧ -b^{16, 38}_0)
c  in CNF:
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_2
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_1
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_0
c  in DIMACS:
 12857  12858 -12859  592 -12860 0
 12857  12858 -12859  592 -12861 0
 12857  12858 -12859  592 -12862 0

c  0-1 --> -1
c    (-b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧ -p_592) -> ( b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0)
c  in CNF:
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨  b^{16, 38}_2
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_1
c     b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨  b^{16, 38}_0
c  in DIMACS:
 12857  12858  12859  592  12860 0
 12857  12858  12859  592 -12861 0
 12857  12858  12859  592  12862 0

c  -1-1 --> -2
c    ( b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧  b^{16, 37}_0 ∧ -p_592) -> ( b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0)
c  in CNF:
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨  b^{16, 38}_2
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨  b^{16, 38}_1
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨  p_592 ∨ -b^{16, 38}_0
c  in DIMACS:
-12857  12858 -12859  592  12860 0
-12857  12858 -12859  592  12861 0
-12857  12858 -12859  592 -12862 0

c  -2-1 --> break 
c    ( b^{16, 37}_2 ∧  b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨  b^{16, 37}_0 ∨  p_592 ∨ break
c  in DIMACS:
-12857 -12858  12859  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 37}_2 ∧ -b^{16, 37}_1 ∧ -b^{16, 37}_0 ∧ true) 
c  in CNF:
c    -b^{16, 37}_2 ∨  b^{16, 37}_1 ∨  b^{16, 37}_0 ∨ false 
c  in DIMACS:
-12857  12858  12859  0

c  3 does not represent an automaton state.
c    -(-b^{16, 37}_2 ∧  b^{16, 37}_1 ∧  b^{16, 37}_0 ∧ true) 
c  in CNF:
c     b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ false 
c  in DIMACS:
 12857 -12858 -12859  0
c  -3 does not represent an automaton state.
c    -( b^{16, 37}_2 ∧  b^{16, 37}_1 ∧  b^{16, 37}_0 ∧ true) 
c  in CNF:
c    -b^{16, 37}_2 ∨ -b^{16, 37}_1 ∨ -b^{16, 37}_0 ∨ false 
c  in DIMACS:
-12857 -12858 -12859  0

c i = 38
c  -2+1 --> -1
c    ( b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧  p_608) -> ( b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0)
c  in CNF:
c    -b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨  b^{16, 39}_2
c    -b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_1
c    -b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨  b^{16, 39}_0
c  in DIMACS:
-12860 -12861  12862 -608  12863 0
-12860 -12861  12862 -608 -12864 0
-12860 -12861  12862 -608  12865 0

c  -1+1 --> 0
c    ( b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0 ∧  p_608) -> (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧ -b^{16, 39}_0)
c  in CNF:
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_2
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_1
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_0
c  in DIMACS:
-12860  12861 -12862 -608 -12863 0
-12860  12861 -12862 -608 -12864 0
-12860  12861 -12862 -608 -12865 0

c  0+1 --> 1
c    (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧  p_608) -> (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0)
c  in CNF:
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_2
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_1
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨  b^{16, 39}_0
c  in DIMACS:
 12860  12861  12862 -608 -12863 0
 12860  12861  12862 -608 -12864 0
 12860  12861  12862 -608  12865 0

c  1+1 --> 2
c    (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0 ∧  p_608) -> (-b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0)
c  in CNF:
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_2
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨  b^{16, 39}_1
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ -p_608 ∨ -b^{16, 39}_0
c  in DIMACS:
 12860  12861 -12862 -608 -12863 0
 12860  12861 -12862 -608  12864 0
 12860  12861 -12862 -608 -12865 0

c  2+1 --> break 
c    (-b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧  p_608) -> break
c  in CNF:
c     b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 12860 -12861  12862 -608 1162 0


c  2-1 --> 1
c    (-b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧ -p_608) -> (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0)
c  in CNF:
c     b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_2
c     b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_1
c     b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨  b^{16, 39}_0
c  in DIMACS:
 12860 -12861  12862  608 -12863 0
 12860 -12861  12862  608 -12864 0
 12860 -12861  12862  608  12865 0

c  1-1 --> 0
c    (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0 ∧ -p_608) -> (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧ -b^{16, 39}_0)
c  in CNF:
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_2
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_1
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_0
c  in DIMACS:
 12860  12861 -12862  608 -12863 0
 12860  12861 -12862  608 -12864 0
 12860  12861 -12862  608 -12865 0

c  0-1 --> -1
c    (-b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧ -p_608) -> ( b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0)
c  in CNF:
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨  b^{16, 39}_2
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_1
c     b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨  b^{16, 39}_0
c  in DIMACS:
 12860  12861  12862  608  12863 0
 12860  12861  12862  608 -12864 0
 12860  12861  12862  608  12865 0

c  -1-1 --> -2
c    ( b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧  b^{16, 38}_0 ∧ -p_608) -> ( b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0)
c  in CNF:
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨  b^{16, 39}_2
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨  b^{16, 39}_1
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨  p_608 ∨ -b^{16, 39}_0
c  in DIMACS:
-12860  12861 -12862  608  12863 0
-12860  12861 -12862  608  12864 0
-12860  12861 -12862  608 -12865 0

c  -2-1 --> break 
c    ( b^{16, 38}_2 ∧  b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨  b^{16, 38}_0 ∨  p_608 ∨ break
c  in DIMACS:
-12860 -12861  12862  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 38}_2 ∧ -b^{16, 38}_1 ∧ -b^{16, 38}_0 ∧ true) 
c  in CNF:
c    -b^{16, 38}_2 ∨  b^{16, 38}_1 ∨  b^{16, 38}_0 ∨ false 
c  in DIMACS:
-12860  12861  12862  0

c  3 does not represent an automaton state.
c    -(-b^{16, 38}_2 ∧  b^{16, 38}_1 ∧  b^{16, 38}_0 ∧ true) 
c  in CNF:
c     b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ false 
c  in DIMACS:
 12860 -12861 -12862  0
c  -3 does not represent an automaton state.
c    -( b^{16, 38}_2 ∧  b^{16, 38}_1 ∧  b^{16, 38}_0 ∧ true) 
c  in CNF:
c    -b^{16, 38}_2 ∨ -b^{16, 38}_1 ∨ -b^{16, 38}_0 ∨ false 
c  in DIMACS:
-12860 -12861 -12862  0

c i = 39
c  -2+1 --> -1
c    ( b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧  p_624) -> ( b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0)
c  in CNF:
c    -b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨  b^{16, 40}_2
c    -b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_1
c    -b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨  b^{16, 40}_0
c  in DIMACS:
-12863 -12864  12865 -624  12866 0
-12863 -12864  12865 -624 -12867 0
-12863 -12864  12865 -624  12868 0

c  -1+1 --> 0
c    ( b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0 ∧  p_624) -> (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧ -b^{16, 40}_0)
c  in CNF:
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_2
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_1
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_0
c  in DIMACS:
-12863  12864 -12865 -624 -12866 0
-12863  12864 -12865 -624 -12867 0
-12863  12864 -12865 -624 -12868 0

c  0+1 --> 1
c    (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧  p_624) -> (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0)
c  in CNF:
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_2
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_1
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨  b^{16, 40}_0
c  in DIMACS:
 12863  12864  12865 -624 -12866 0
 12863  12864  12865 -624 -12867 0
 12863  12864  12865 -624  12868 0

c  1+1 --> 2
c    (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0 ∧  p_624) -> (-b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0)
c  in CNF:
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_2
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨  b^{16, 40}_1
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ -p_624 ∨ -b^{16, 40}_0
c  in DIMACS:
 12863  12864 -12865 -624 -12866 0
 12863  12864 -12865 -624  12867 0
 12863  12864 -12865 -624 -12868 0

c  2+1 --> break 
c    (-b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧  p_624) -> break
c  in CNF:
c     b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 12863 -12864  12865 -624 1162 0


c  2-1 --> 1
c    (-b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧ -p_624) -> (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0)
c  in CNF:
c     b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_2
c     b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_1
c     b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨  b^{16, 40}_0
c  in DIMACS:
 12863 -12864  12865  624 -12866 0
 12863 -12864  12865  624 -12867 0
 12863 -12864  12865  624  12868 0

c  1-1 --> 0
c    (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0 ∧ -p_624) -> (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧ -b^{16, 40}_0)
c  in CNF:
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_2
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_1
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_0
c  in DIMACS:
 12863  12864 -12865  624 -12866 0
 12863  12864 -12865  624 -12867 0
 12863  12864 -12865  624 -12868 0

c  0-1 --> -1
c    (-b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧ -p_624) -> ( b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0)
c  in CNF:
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨  b^{16, 40}_2
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_1
c     b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨  b^{16, 40}_0
c  in DIMACS:
 12863  12864  12865  624  12866 0
 12863  12864  12865  624 -12867 0
 12863  12864  12865  624  12868 0

c  -1-1 --> -2
c    ( b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧  b^{16, 39}_0 ∧ -p_624) -> ( b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0)
c  in CNF:
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨  b^{16, 40}_2
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨  b^{16, 40}_1
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨  p_624 ∨ -b^{16, 40}_0
c  in DIMACS:
-12863  12864 -12865  624  12866 0
-12863  12864 -12865  624  12867 0
-12863  12864 -12865  624 -12868 0

c  -2-1 --> break 
c    ( b^{16, 39}_2 ∧  b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨  b^{16, 39}_0 ∨  p_624 ∨ break
c  in DIMACS:
-12863 -12864  12865  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 39}_2 ∧ -b^{16, 39}_1 ∧ -b^{16, 39}_0 ∧ true) 
c  in CNF:
c    -b^{16, 39}_2 ∨  b^{16, 39}_1 ∨  b^{16, 39}_0 ∨ false 
c  in DIMACS:
-12863  12864  12865  0

c  3 does not represent an automaton state.
c    -(-b^{16, 39}_2 ∧  b^{16, 39}_1 ∧  b^{16, 39}_0 ∧ true) 
c  in CNF:
c     b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ false 
c  in DIMACS:
 12863 -12864 -12865  0
c  -3 does not represent an automaton state.
c    -( b^{16, 39}_2 ∧  b^{16, 39}_1 ∧  b^{16, 39}_0 ∧ true) 
c  in CNF:
c    -b^{16, 39}_2 ∨ -b^{16, 39}_1 ∨ -b^{16, 39}_0 ∨ false 
c  in DIMACS:
-12863 -12864 -12865  0

c i = 40
c  -2+1 --> -1
c    ( b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧  p_640) -> ( b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0)
c  in CNF:
c    -b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨  b^{16, 41}_2
c    -b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_1
c    -b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨  b^{16, 41}_0
c  in DIMACS:
-12866 -12867  12868 -640  12869 0
-12866 -12867  12868 -640 -12870 0
-12866 -12867  12868 -640  12871 0

c  -1+1 --> 0
c    ( b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0 ∧  p_640) -> (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧ -b^{16, 41}_0)
c  in CNF:
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_2
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_1
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_0
c  in DIMACS:
-12866  12867 -12868 -640 -12869 0
-12866  12867 -12868 -640 -12870 0
-12866  12867 -12868 -640 -12871 0

c  0+1 --> 1
c    (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧  p_640) -> (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0)
c  in CNF:
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_2
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_1
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨  b^{16, 41}_0
c  in DIMACS:
 12866  12867  12868 -640 -12869 0
 12866  12867  12868 -640 -12870 0
 12866  12867  12868 -640  12871 0

c  1+1 --> 2
c    (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0 ∧  p_640) -> (-b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0)
c  in CNF:
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_2
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨  b^{16, 41}_1
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ -p_640 ∨ -b^{16, 41}_0
c  in DIMACS:
 12866  12867 -12868 -640 -12869 0
 12866  12867 -12868 -640  12870 0
 12866  12867 -12868 -640 -12871 0

c  2+1 --> break 
c    (-b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧  p_640) -> break
c  in CNF:
c     b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 12866 -12867  12868 -640 1162 0


c  2-1 --> 1
c    (-b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧ -p_640) -> (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0)
c  in CNF:
c     b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_2
c     b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_1
c     b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨  b^{16, 41}_0
c  in DIMACS:
 12866 -12867  12868  640 -12869 0
 12866 -12867  12868  640 -12870 0
 12866 -12867  12868  640  12871 0

c  1-1 --> 0
c    (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0 ∧ -p_640) -> (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧ -b^{16, 41}_0)
c  in CNF:
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_2
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_1
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_0
c  in DIMACS:
 12866  12867 -12868  640 -12869 0
 12866  12867 -12868  640 -12870 0
 12866  12867 -12868  640 -12871 0

c  0-1 --> -1
c    (-b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧ -p_640) -> ( b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0)
c  in CNF:
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨  b^{16, 41}_2
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_1
c     b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨  b^{16, 41}_0
c  in DIMACS:
 12866  12867  12868  640  12869 0
 12866  12867  12868  640 -12870 0
 12866  12867  12868  640  12871 0

c  -1-1 --> -2
c    ( b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧  b^{16, 40}_0 ∧ -p_640) -> ( b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0)
c  in CNF:
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨  b^{16, 41}_2
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨  b^{16, 41}_1
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨  p_640 ∨ -b^{16, 41}_0
c  in DIMACS:
-12866  12867 -12868  640  12869 0
-12866  12867 -12868  640  12870 0
-12866  12867 -12868  640 -12871 0

c  -2-1 --> break 
c    ( b^{16, 40}_2 ∧  b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨  b^{16, 40}_0 ∨  p_640 ∨ break
c  in DIMACS:
-12866 -12867  12868  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 40}_2 ∧ -b^{16, 40}_1 ∧ -b^{16, 40}_0 ∧ true) 
c  in CNF:
c    -b^{16, 40}_2 ∨  b^{16, 40}_1 ∨  b^{16, 40}_0 ∨ false 
c  in DIMACS:
-12866  12867  12868  0

c  3 does not represent an automaton state.
c    -(-b^{16, 40}_2 ∧  b^{16, 40}_1 ∧  b^{16, 40}_0 ∧ true) 
c  in CNF:
c     b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ false 
c  in DIMACS:
 12866 -12867 -12868  0
c  -3 does not represent an automaton state.
c    -( b^{16, 40}_2 ∧  b^{16, 40}_1 ∧  b^{16, 40}_0 ∧ true) 
c  in CNF:
c    -b^{16, 40}_2 ∨ -b^{16, 40}_1 ∨ -b^{16, 40}_0 ∨ false 
c  in DIMACS:
-12866 -12867 -12868  0

c i = 41
c  -2+1 --> -1
c    ( b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧  p_656) -> ( b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0)
c  in CNF:
c    -b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨  b^{16, 42}_2
c    -b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_1
c    -b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨  b^{16, 42}_0
c  in DIMACS:
-12869 -12870  12871 -656  12872 0
-12869 -12870  12871 -656 -12873 0
-12869 -12870  12871 -656  12874 0

c  -1+1 --> 0
c    ( b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0 ∧  p_656) -> (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧ -b^{16, 42}_0)
c  in CNF:
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_2
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_1
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_0
c  in DIMACS:
-12869  12870 -12871 -656 -12872 0
-12869  12870 -12871 -656 -12873 0
-12869  12870 -12871 -656 -12874 0

c  0+1 --> 1
c    (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧  p_656) -> (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0)
c  in CNF:
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_2
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_1
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨  b^{16, 42}_0
c  in DIMACS:
 12869  12870  12871 -656 -12872 0
 12869  12870  12871 -656 -12873 0
 12869  12870  12871 -656  12874 0

c  1+1 --> 2
c    (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0 ∧  p_656) -> (-b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0)
c  in CNF:
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_2
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨  b^{16, 42}_1
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ -p_656 ∨ -b^{16, 42}_0
c  in DIMACS:
 12869  12870 -12871 -656 -12872 0
 12869  12870 -12871 -656  12873 0
 12869  12870 -12871 -656 -12874 0

c  2+1 --> break 
c    (-b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧  p_656) -> break
c  in CNF:
c     b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 12869 -12870  12871 -656 1162 0


c  2-1 --> 1
c    (-b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧ -p_656) -> (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0)
c  in CNF:
c     b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_2
c     b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_1
c     b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨  b^{16, 42}_0
c  in DIMACS:
 12869 -12870  12871  656 -12872 0
 12869 -12870  12871  656 -12873 0
 12869 -12870  12871  656  12874 0

c  1-1 --> 0
c    (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0 ∧ -p_656) -> (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧ -b^{16, 42}_0)
c  in CNF:
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_2
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_1
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_0
c  in DIMACS:
 12869  12870 -12871  656 -12872 0
 12869  12870 -12871  656 -12873 0
 12869  12870 -12871  656 -12874 0

c  0-1 --> -1
c    (-b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧ -p_656) -> ( b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0)
c  in CNF:
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨  b^{16, 42}_2
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_1
c     b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨  b^{16, 42}_0
c  in DIMACS:
 12869  12870  12871  656  12872 0
 12869  12870  12871  656 -12873 0
 12869  12870  12871  656  12874 0

c  -1-1 --> -2
c    ( b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧  b^{16, 41}_0 ∧ -p_656) -> ( b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0)
c  in CNF:
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨  b^{16, 42}_2
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨  b^{16, 42}_1
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨  p_656 ∨ -b^{16, 42}_0
c  in DIMACS:
-12869  12870 -12871  656  12872 0
-12869  12870 -12871  656  12873 0
-12869  12870 -12871  656 -12874 0

c  -2-1 --> break 
c    ( b^{16, 41}_2 ∧  b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨  b^{16, 41}_0 ∨  p_656 ∨ break
c  in DIMACS:
-12869 -12870  12871  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 41}_2 ∧ -b^{16, 41}_1 ∧ -b^{16, 41}_0 ∧ true) 
c  in CNF:
c    -b^{16, 41}_2 ∨  b^{16, 41}_1 ∨  b^{16, 41}_0 ∨ false 
c  in DIMACS:
-12869  12870  12871  0

c  3 does not represent an automaton state.
c    -(-b^{16, 41}_2 ∧  b^{16, 41}_1 ∧  b^{16, 41}_0 ∧ true) 
c  in CNF:
c     b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ false 
c  in DIMACS:
 12869 -12870 -12871  0
c  -3 does not represent an automaton state.
c    -( b^{16, 41}_2 ∧  b^{16, 41}_1 ∧  b^{16, 41}_0 ∧ true) 
c  in CNF:
c    -b^{16, 41}_2 ∨ -b^{16, 41}_1 ∨ -b^{16, 41}_0 ∨ false 
c  in DIMACS:
-12869 -12870 -12871  0

c i = 42
c  -2+1 --> -1
c    ( b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧  p_672) -> ( b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0)
c  in CNF:
c    -b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨  b^{16, 43}_2
c    -b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_1
c    -b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨  b^{16, 43}_0
c  in DIMACS:
-12872 -12873  12874 -672  12875 0
-12872 -12873  12874 -672 -12876 0
-12872 -12873  12874 -672  12877 0

c  -1+1 --> 0
c    ( b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0 ∧  p_672) -> (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧ -b^{16, 43}_0)
c  in CNF:
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_2
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_1
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_0
c  in DIMACS:
-12872  12873 -12874 -672 -12875 0
-12872  12873 -12874 -672 -12876 0
-12872  12873 -12874 -672 -12877 0

c  0+1 --> 1
c    (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧  p_672) -> (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0)
c  in CNF:
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_2
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_1
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨  b^{16, 43}_0
c  in DIMACS:
 12872  12873  12874 -672 -12875 0
 12872  12873  12874 -672 -12876 0
 12872  12873  12874 -672  12877 0

c  1+1 --> 2
c    (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0 ∧  p_672) -> (-b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0)
c  in CNF:
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_2
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨  b^{16, 43}_1
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ -p_672 ∨ -b^{16, 43}_0
c  in DIMACS:
 12872  12873 -12874 -672 -12875 0
 12872  12873 -12874 -672  12876 0
 12872  12873 -12874 -672 -12877 0

c  2+1 --> break 
c    (-b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧  p_672) -> break
c  in CNF:
c     b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 12872 -12873  12874 -672 1162 0


c  2-1 --> 1
c    (-b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧ -p_672) -> (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0)
c  in CNF:
c     b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_2
c     b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_1
c     b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨  b^{16, 43}_0
c  in DIMACS:
 12872 -12873  12874  672 -12875 0
 12872 -12873  12874  672 -12876 0
 12872 -12873  12874  672  12877 0

c  1-1 --> 0
c    (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0 ∧ -p_672) -> (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧ -b^{16, 43}_0)
c  in CNF:
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_2
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_1
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_0
c  in DIMACS:
 12872  12873 -12874  672 -12875 0
 12872  12873 -12874  672 -12876 0
 12872  12873 -12874  672 -12877 0

c  0-1 --> -1
c    (-b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧ -p_672) -> ( b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0)
c  in CNF:
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨  b^{16, 43}_2
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_1
c     b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨  b^{16, 43}_0
c  in DIMACS:
 12872  12873  12874  672  12875 0
 12872  12873  12874  672 -12876 0
 12872  12873  12874  672  12877 0

c  -1-1 --> -2
c    ( b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧  b^{16, 42}_0 ∧ -p_672) -> ( b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0)
c  in CNF:
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨  b^{16, 43}_2
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨  b^{16, 43}_1
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨  p_672 ∨ -b^{16, 43}_0
c  in DIMACS:
-12872  12873 -12874  672  12875 0
-12872  12873 -12874  672  12876 0
-12872  12873 -12874  672 -12877 0

c  -2-1 --> break 
c    ( b^{16, 42}_2 ∧  b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨  b^{16, 42}_0 ∨  p_672 ∨ break
c  in DIMACS:
-12872 -12873  12874  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 42}_2 ∧ -b^{16, 42}_1 ∧ -b^{16, 42}_0 ∧ true) 
c  in CNF:
c    -b^{16, 42}_2 ∨  b^{16, 42}_1 ∨  b^{16, 42}_0 ∨ false 
c  in DIMACS:
-12872  12873  12874  0

c  3 does not represent an automaton state.
c    -(-b^{16, 42}_2 ∧  b^{16, 42}_1 ∧  b^{16, 42}_0 ∧ true) 
c  in CNF:
c     b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ false 
c  in DIMACS:
 12872 -12873 -12874  0
c  -3 does not represent an automaton state.
c    -( b^{16, 42}_2 ∧  b^{16, 42}_1 ∧  b^{16, 42}_0 ∧ true) 
c  in CNF:
c    -b^{16, 42}_2 ∨ -b^{16, 42}_1 ∨ -b^{16, 42}_0 ∨ false 
c  in DIMACS:
-12872 -12873 -12874  0

c i = 43
c  -2+1 --> -1
c    ( b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧  p_688) -> ( b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0)
c  in CNF:
c    -b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨  b^{16, 44}_2
c    -b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_1
c    -b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨  b^{16, 44}_0
c  in DIMACS:
-12875 -12876  12877 -688  12878 0
-12875 -12876  12877 -688 -12879 0
-12875 -12876  12877 -688  12880 0

c  -1+1 --> 0
c    ( b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0 ∧  p_688) -> (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧ -b^{16, 44}_0)
c  in CNF:
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_2
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_1
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_0
c  in DIMACS:
-12875  12876 -12877 -688 -12878 0
-12875  12876 -12877 -688 -12879 0
-12875  12876 -12877 -688 -12880 0

c  0+1 --> 1
c    (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧  p_688) -> (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0)
c  in CNF:
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_2
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_1
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨  b^{16, 44}_0
c  in DIMACS:
 12875  12876  12877 -688 -12878 0
 12875  12876  12877 -688 -12879 0
 12875  12876  12877 -688  12880 0

c  1+1 --> 2
c    (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0 ∧  p_688) -> (-b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0)
c  in CNF:
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_2
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨  b^{16, 44}_1
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ -p_688 ∨ -b^{16, 44}_0
c  in DIMACS:
 12875  12876 -12877 -688 -12878 0
 12875  12876 -12877 -688  12879 0
 12875  12876 -12877 -688 -12880 0

c  2+1 --> break 
c    (-b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧  p_688) -> break
c  in CNF:
c     b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 12875 -12876  12877 -688 1162 0


c  2-1 --> 1
c    (-b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧ -p_688) -> (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0)
c  in CNF:
c     b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_2
c     b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_1
c     b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨  b^{16, 44}_0
c  in DIMACS:
 12875 -12876  12877  688 -12878 0
 12875 -12876  12877  688 -12879 0
 12875 -12876  12877  688  12880 0

c  1-1 --> 0
c    (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0 ∧ -p_688) -> (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧ -b^{16, 44}_0)
c  in CNF:
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_2
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_1
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_0
c  in DIMACS:
 12875  12876 -12877  688 -12878 0
 12875  12876 -12877  688 -12879 0
 12875  12876 -12877  688 -12880 0

c  0-1 --> -1
c    (-b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧ -p_688) -> ( b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0)
c  in CNF:
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨  b^{16, 44}_2
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_1
c     b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨  b^{16, 44}_0
c  in DIMACS:
 12875  12876  12877  688  12878 0
 12875  12876  12877  688 -12879 0
 12875  12876  12877  688  12880 0

c  -1-1 --> -2
c    ( b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧  b^{16, 43}_0 ∧ -p_688) -> ( b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0)
c  in CNF:
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨  b^{16, 44}_2
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨  b^{16, 44}_1
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨  p_688 ∨ -b^{16, 44}_0
c  in DIMACS:
-12875  12876 -12877  688  12878 0
-12875  12876 -12877  688  12879 0
-12875  12876 -12877  688 -12880 0

c  -2-1 --> break 
c    ( b^{16, 43}_2 ∧  b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨  b^{16, 43}_0 ∨  p_688 ∨ break
c  in DIMACS:
-12875 -12876  12877  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 43}_2 ∧ -b^{16, 43}_1 ∧ -b^{16, 43}_0 ∧ true) 
c  in CNF:
c    -b^{16, 43}_2 ∨  b^{16, 43}_1 ∨  b^{16, 43}_0 ∨ false 
c  in DIMACS:
-12875  12876  12877  0

c  3 does not represent an automaton state.
c    -(-b^{16, 43}_2 ∧  b^{16, 43}_1 ∧  b^{16, 43}_0 ∧ true) 
c  in CNF:
c     b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ false 
c  in DIMACS:
 12875 -12876 -12877  0
c  -3 does not represent an automaton state.
c    -( b^{16, 43}_2 ∧  b^{16, 43}_1 ∧  b^{16, 43}_0 ∧ true) 
c  in CNF:
c    -b^{16, 43}_2 ∨ -b^{16, 43}_1 ∨ -b^{16, 43}_0 ∨ false 
c  in DIMACS:
-12875 -12876 -12877  0

c i = 44
c  -2+1 --> -1
c    ( b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧  p_704) -> ( b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0)
c  in CNF:
c    -b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨  b^{16, 45}_2
c    -b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_1
c    -b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨  b^{16, 45}_0
c  in DIMACS:
-12878 -12879  12880 -704  12881 0
-12878 -12879  12880 -704 -12882 0
-12878 -12879  12880 -704  12883 0

c  -1+1 --> 0
c    ( b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0 ∧  p_704) -> (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧ -b^{16, 45}_0)
c  in CNF:
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_2
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_1
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_0
c  in DIMACS:
-12878  12879 -12880 -704 -12881 0
-12878  12879 -12880 -704 -12882 0
-12878  12879 -12880 -704 -12883 0

c  0+1 --> 1
c    (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧  p_704) -> (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0)
c  in CNF:
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_2
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_1
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨  b^{16, 45}_0
c  in DIMACS:
 12878  12879  12880 -704 -12881 0
 12878  12879  12880 -704 -12882 0
 12878  12879  12880 -704  12883 0

c  1+1 --> 2
c    (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0 ∧  p_704) -> (-b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0)
c  in CNF:
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_2
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨  b^{16, 45}_1
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ -p_704 ∨ -b^{16, 45}_0
c  in DIMACS:
 12878  12879 -12880 -704 -12881 0
 12878  12879 -12880 -704  12882 0
 12878  12879 -12880 -704 -12883 0

c  2+1 --> break 
c    (-b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧  p_704) -> break
c  in CNF:
c     b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 12878 -12879  12880 -704 1162 0


c  2-1 --> 1
c    (-b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧ -p_704) -> (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0)
c  in CNF:
c     b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_2
c     b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_1
c     b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨  b^{16, 45}_0
c  in DIMACS:
 12878 -12879  12880  704 -12881 0
 12878 -12879  12880  704 -12882 0
 12878 -12879  12880  704  12883 0

c  1-1 --> 0
c    (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0 ∧ -p_704) -> (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧ -b^{16, 45}_0)
c  in CNF:
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_2
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_1
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_0
c  in DIMACS:
 12878  12879 -12880  704 -12881 0
 12878  12879 -12880  704 -12882 0
 12878  12879 -12880  704 -12883 0

c  0-1 --> -1
c    (-b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧ -p_704) -> ( b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0)
c  in CNF:
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨  b^{16, 45}_2
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_1
c     b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨  b^{16, 45}_0
c  in DIMACS:
 12878  12879  12880  704  12881 0
 12878  12879  12880  704 -12882 0
 12878  12879  12880  704  12883 0

c  -1-1 --> -2
c    ( b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧  b^{16, 44}_0 ∧ -p_704) -> ( b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0)
c  in CNF:
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨  b^{16, 45}_2
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨  b^{16, 45}_1
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨  p_704 ∨ -b^{16, 45}_0
c  in DIMACS:
-12878  12879 -12880  704  12881 0
-12878  12879 -12880  704  12882 0
-12878  12879 -12880  704 -12883 0

c  -2-1 --> break 
c    ( b^{16, 44}_2 ∧  b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨  b^{16, 44}_0 ∨  p_704 ∨ break
c  in DIMACS:
-12878 -12879  12880  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 44}_2 ∧ -b^{16, 44}_1 ∧ -b^{16, 44}_0 ∧ true) 
c  in CNF:
c    -b^{16, 44}_2 ∨  b^{16, 44}_1 ∨  b^{16, 44}_0 ∨ false 
c  in DIMACS:
-12878  12879  12880  0

c  3 does not represent an automaton state.
c    -(-b^{16, 44}_2 ∧  b^{16, 44}_1 ∧  b^{16, 44}_0 ∧ true) 
c  in CNF:
c     b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ false 
c  in DIMACS:
 12878 -12879 -12880  0
c  -3 does not represent an automaton state.
c    -( b^{16, 44}_2 ∧  b^{16, 44}_1 ∧  b^{16, 44}_0 ∧ true) 
c  in CNF:
c    -b^{16, 44}_2 ∨ -b^{16, 44}_1 ∨ -b^{16, 44}_0 ∨ false 
c  in DIMACS:
-12878 -12879 -12880  0

c i = 45
c  -2+1 --> -1
c    ( b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧  p_720) -> ( b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0)
c  in CNF:
c    -b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨  b^{16, 46}_2
c    -b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_1
c    -b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨  b^{16, 46}_0
c  in DIMACS:
-12881 -12882  12883 -720  12884 0
-12881 -12882  12883 -720 -12885 0
-12881 -12882  12883 -720  12886 0

c  -1+1 --> 0
c    ( b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0 ∧  p_720) -> (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧ -b^{16, 46}_0)
c  in CNF:
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_2
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_1
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_0
c  in DIMACS:
-12881  12882 -12883 -720 -12884 0
-12881  12882 -12883 -720 -12885 0
-12881  12882 -12883 -720 -12886 0

c  0+1 --> 1
c    (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧  p_720) -> (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0)
c  in CNF:
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_2
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_1
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨  b^{16, 46}_0
c  in DIMACS:
 12881  12882  12883 -720 -12884 0
 12881  12882  12883 -720 -12885 0
 12881  12882  12883 -720  12886 0

c  1+1 --> 2
c    (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0 ∧  p_720) -> (-b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0)
c  in CNF:
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_2
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨  b^{16, 46}_1
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ -p_720 ∨ -b^{16, 46}_0
c  in DIMACS:
 12881  12882 -12883 -720 -12884 0
 12881  12882 -12883 -720  12885 0
 12881  12882 -12883 -720 -12886 0

c  2+1 --> break 
c    (-b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧  p_720) -> break
c  in CNF:
c     b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 12881 -12882  12883 -720 1162 0


c  2-1 --> 1
c    (-b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧ -p_720) -> (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0)
c  in CNF:
c     b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_2
c     b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_1
c     b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨  b^{16, 46}_0
c  in DIMACS:
 12881 -12882  12883  720 -12884 0
 12881 -12882  12883  720 -12885 0
 12881 -12882  12883  720  12886 0

c  1-1 --> 0
c    (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0 ∧ -p_720) -> (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧ -b^{16, 46}_0)
c  in CNF:
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_2
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_1
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_0
c  in DIMACS:
 12881  12882 -12883  720 -12884 0
 12881  12882 -12883  720 -12885 0
 12881  12882 -12883  720 -12886 0

c  0-1 --> -1
c    (-b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧ -p_720) -> ( b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0)
c  in CNF:
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨  b^{16, 46}_2
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_1
c     b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨  b^{16, 46}_0
c  in DIMACS:
 12881  12882  12883  720  12884 0
 12881  12882  12883  720 -12885 0
 12881  12882  12883  720  12886 0

c  -1-1 --> -2
c    ( b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧  b^{16, 45}_0 ∧ -p_720) -> ( b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0)
c  in CNF:
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨  b^{16, 46}_2
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨  b^{16, 46}_1
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨  p_720 ∨ -b^{16, 46}_0
c  in DIMACS:
-12881  12882 -12883  720  12884 0
-12881  12882 -12883  720  12885 0
-12881  12882 -12883  720 -12886 0

c  -2-1 --> break 
c    ( b^{16, 45}_2 ∧  b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨  b^{16, 45}_0 ∨  p_720 ∨ break
c  in DIMACS:
-12881 -12882  12883  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 45}_2 ∧ -b^{16, 45}_1 ∧ -b^{16, 45}_0 ∧ true) 
c  in CNF:
c    -b^{16, 45}_2 ∨  b^{16, 45}_1 ∨  b^{16, 45}_0 ∨ false 
c  in DIMACS:
-12881  12882  12883  0

c  3 does not represent an automaton state.
c    -(-b^{16, 45}_2 ∧  b^{16, 45}_1 ∧  b^{16, 45}_0 ∧ true) 
c  in CNF:
c     b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ false 
c  in DIMACS:
 12881 -12882 -12883  0
c  -3 does not represent an automaton state.
c    -( b^{16, 45}_2 ∧  b^{16, 45}_1 ∧  b^{16, 45}_0 ∧ true) 
c  in CNF:
c    -b^{16, 45}_2 ∨ -b^{16, 45}_1 ∨ -b^{16, 45}_0 ∨ false 
c  in DIMACS:
-12881 -12882 -12883  0

c i = 46
c  -2+1 --> -1
c    ( b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧  p_736) -> ( b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0)
c  in CNF:
c    -b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨  b^{16, 47}_2
c    -b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_1
c    -b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨  b^{16, 47}_0
c  in DIMACS:
-12884 -12885  12886 -736  12887 0
-12884 -12885  12886 -736 -12888 0
-12884 -12885  12886 -736  12889 0

c  -1+1 --> 0
c    ( b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0 ∧  p_736) -> (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧ -b^{16, 47}_0)
c  in CNF:
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_2
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_1
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_0
c  in DIMACS:
-12884  12885 -12886 -736 -12887 0
-12884  12885 -12886 -736 -12888 0
-12884  12885 -12886 -736 -12889 0

c  0+1 --> 1
c    (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧  p_736) -> (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0)
c  in CNF:
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_2
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_1
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨  b^{16, 47}_0
c  in DIMACS:
 12884  12885  12886 -736 -12887 0
 12884  12885  12886 -736 -12888 0
 12884  12885  12886 -736  12889 0

c  1+1 --> 2
c    (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0 ∧  p_736) -> (-b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0)
c  in CNF:
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_2
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨  b^{16, 47}_1
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ -p_736 ∨ -b^{16, 47}_0
c  in DIMACS:
 12884  12885 -12886 -736 -12887 0
 12884  12885 -12886 -736  12888 0
 12884  12885 -12886 -736 -12889 0

c  2+1 --> break 
c    (-b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧  p_736) -> break
c  in CNF:
c     b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 12884 -12885  12886 -736 1162 0


c  2-1 --> 1
c    (-b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧ -p_736) -> (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0)
c  in CNF:
c     b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_2
c     b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_1
c     b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨  b^{16, 47}_0
c  in DIMACS:
 12884 -12885  12886  736 -12887 0
 12884 -12885  12886  736 -12888 0
 12884 -12885  12886  736  12889 0

c  1-1 --> 0
c    (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0 ∧ -p_736) -> (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧ -b^{16, 47}_0)
c  in CNF:
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_2
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_1
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_0
c  in DIMACS:
 12884  12885 -12886  736 -12887 0
 12884  12885 -12886  736 -12888 0
 12884  12885 -12886  736 -12889 0

c  0-1 --> -1
c    (-b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧ -p_736) -> ( b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0)
c  in CNF:
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨  b^{16, 47}_2
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_1
c     b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨  b^{16, 47}_0
c  in DIMACS:
 12884  12885  12886  736  12887 0
 12884  12885  12886  736 -12888 0
 12884  12885  12886  736  12889 0

c  -1-1 --> -2
c    ( b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧  b^{16, 46}_0 ∧ -p_736) -> ( b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0)
c  in CNF:
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨  b^{16, 47}_2
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨  b^{16, 47}_1
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨  p_736 ∨ -b^{16, 47}_0
c  in DIMACS:
-12884  12885 -12886  736  12887 0
-12884  12885 -12886  736  12888 0
-12884  12885 -12886  736 -12889 0

c  -2-1 --> break 
c    ( b^{16, 46}_2 ∧  b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨  b^{16, 46}_0 ∨  p_736 ∨ break
c  in DIMACS:
-12884 -12885  12886  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 46}_2 ∧ -b^{16, 46}_1 ∧ -b^{16, 46}_0 ∧ true) 
c  in CNF:
c    -b^{16, 46}_2 ∨  b^{16, 46}_1 ∨  b^{16, 46}_0 ∨ false 
c  in DIMACS:
-12884  12885  12886  0

c  3 does not represent an automaton state.
c    -(-b^{16, 46}_2 ∧  b^{16, 46}_1 ∧  b^{16, 46}_0 ∧ true) 
c  in CNF:
c     b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ false 
c  in DIMACS:
 12884 -12885 -12886  0
c  -3 does not represent an automaton state.
c    -( b^{16, 46}_2 ∧  b^{16, 46}_1 ∧  b^{16, 46}_0 ∧ true) 
c  in CNF:
c    -b^{16, 46}_2 ∨ -b^{16, 46}_1 ∨ -b^{16, 46}_0 ∨ false 
c  in DIMACS:
-12884 -12885 -12886  0

c i = 47
c  -2+1 --> -1
c    ( b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧  p_752) -> ( b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0)
c  in CNF:
c    -b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨  b^{16, 48}_2
c    -b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_1
c    -b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨  b^{16, 48}_0
c  in DIMACS:
-12887 -12888  12889 -752  12890 0
-12887 -12888  12889 -752 -12891 0
-12887 -12888  12889 -752  12892 0

c  -1+1 --> 0
c    ( b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0 ∧  p_752) -> (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧ -b^{16, 48}_0)
c  in CNF:
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_2
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_1
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_0
c  in DIMACS:
-12887  12888 -12889 -752 -12890 0
-12887  12888 -12889 -752 -12891 0
-12887  12888 -12889 -752 -12892 0

c  0+1 --> 1
c    (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧  p_752) -> (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0)
c  in CNF:
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_2
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_1
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨  b^{16, 48}_0
c  in DIMACS:
 12887  12888  12889 -752 -12890 0
 12887  12888  12889 -752 -12891 0
 12887  12888  12889 -752  12892 0

c  1+1 --> 2
c    (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0 ∧  p_752) -> (-b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0)
c  in CNF:
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_2
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨  b^{16, 48}_1
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ -p_752 ∨ -b^{16, 48}_0
c  in DIMACS:
 12887  12888 -12889 -752 -12890 0
 12887  12888 -12889 -752  12891 0
 12887  12888 -12889 -752 -12892 0

c  2+1 --> break 
c    (-b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧  p_752) -> break
c  in CNF:
c     b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 12887 -12888  12889 -752 1162 0


c  2-1 --> 1
c    (-b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧ -p_752) -> (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0)
c  in CNF:
c     b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_2
c     b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_1
c     b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨  b^{16, 48}_0
c  in DIMACS:
 12887 -12888  12889  752 -12890 0
 12887 -12888  12889  752 -12891 0
 12887 -12888  12889  752  12892 0

c  1-1 --> 0
c    (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0 ∧ -p_752) -> (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧ -b^{16, 48}_0)
c  in CNF:
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_2
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_1
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_0
c  in DIMACS:
 12887  12888 -12889  752 -12890 0
 12887  12888 -12889  752 -12891 0
 12887  12888 -12889  752 -12892 0

c  0-1 --> -1
c    (-b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧ -p_752) -> ( b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0)
c  in CNF:
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨  b^{16, 48}_2
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_1
c     b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨  b^{16, 48}_0
c  in DIMACS:
 12887  12888  12889  752  12890 0
 12887  12888  12889  752 -12891 0
 12887  12888  12889  752  12892 0

c  -1-1 --> -2
c    ( b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧  b^{16, 47}_0 ∧ -p_752) -> ( b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0)
c  in CNF:
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨  b^{16, 48}_2
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨  b^{16, 48}_1
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨  p_752 ∨ -b^{16, 48}_0
c  in DIMACS:
-12887  12888 -12889  752  12890 0
-12887  12888 -12889  752  12891 0
-12887  12888 -12889  752 -12892 0

c  -2-1 --> break 
c    ( b^{16, 47}_2 ∧  b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨  b^{16, 47}_0 ∨  p_752 ∨ break
c  in DIMACS:
-12887 -12888  12889  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 47}_2 ∧ -b^{16, 47}_1 ∧ -b^{16, 47}_0 ∧ true) 
c  in CNF:
c    -b^{16, 47}_2 ∨  b^{16, 47}_1 ∨  b^{16, 47}_0 ∨ false 
c  in DIMACS:
-12887  12888  12889  0

c  3 does not represent an automaton state.
c    -(-b^{16, 47}_2 ∧  b^{16, 47}_1 ∧  b^{16, 47}_0 ∧ true) 
c  in CNF:
c     b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ false 
c  in DIMACS:
 12887 -12888 -12889  0
c  -3 does not represent an automaton state.
c    -( b^{16, 47}_2 ∧  b^{16, 47}_1 ∧  b^{16, 47}_0 ∧ true) 
c  in CNF:
c    -b^{16, 47}_2 ∨ -b^{16, 47}_1 ∨ -b^{16, 47}_0 ∨ false 
c  in DIMACS:
-12887 -12888 -12889  0

c i = 48
c  -2+1 --> -1
c    ( b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧  p_768) -> ( b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0)
c  in CNF:
c    -b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨  b^{16, 49}_2
c    -b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_1
c    -b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨  b^{16, 49}_0
c  in DIMACS:
-12890 -12891  12892 -768  12893 0
-12890 -12891  12892 -768 -12894 0
-12890 -12891  12892 -768  12895 0

c  -1+1 --> 0
c    ( b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0 ∧  p_768) -> (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧ -b^{16, 49}_0)
c  in CNF:
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_2
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_1
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_0
c  in DIMACS:
-12890  12891 -12892 -768 -12893 0
-12890  12891 -12892 -768 -12894 0
-12890  12891 -12892 -768 -12895 0

c  0+1 --> 1
c    (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧  p_768) -> (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0)
c  in CNF:
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_2
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_1
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨  b^{16, 49}_0
c  in DIMACS:
 12890  12891  12892 -768 -12893 0
 12890  12891  12892 -768 -12894 0
 12890  12891  12892 -768  12895 0

c  1+1 --> 2
c    (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0 ∧  p_768) -> (-b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0)
c  in CNF:
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_2
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨  b^{16, 49}_1
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ -p_768 ∨ -b^{16, 49}_0
c  in DIMACS:
 12890  12891 -12892 -768 -12893 0
 12890  12891 -12892 -768  12894 0
 12890  12891 -12892 -768 -12895 0

c  2+1 --> break 
c    (-b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧  p_768) -> break
c  in CNF:
c     b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 12890 -12891  12892 -768 1162 0


c  2-1 --> 1
c    (-b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧ -p_768) -> (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0)
c  in CNF:
c     b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_2
c     b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_1
c     b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨  b^{16, 49}_0
c  in DIMACS:
 12890 -12891  12892  768 -12893 0
 12890 -12891  12892  768 -12894 0
 12890 -12891  12892  768  12895 0

c  1-1 --> 0
c    (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0 ∧ -p_768) -> (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧ -b^{16, 49}_0)
c  in CNF:
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_2
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_1
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_0
c  in DIMACS:
 12890  12891 -12892  768 -12893 0
 12890  12891 -12892  768 -12894 0
 12890  12891 -12892  768 -12895 0

c  0-1 --> -1
c    (-b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧ -p_768) -> ( b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0)
c  in CNF:
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨  b^{16, 49}_2
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_1
c     b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨  b^{16, 49}_0
c  in DIMACS:
 12890  12891  12892  768  12893 0
 12890  12891  12892  768 -12894 0
 12890  12891  12892  768  12895 0

c  -1-1 --> -2
c    ( b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧  b^{16, 48}_0 ∧ -p_768) -> ( b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0)
c  in CNF:
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨  b^{16, 49}_2
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨  b^{16, 49}_1
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨  p_768 ∨ -b^{16, 49}_0
c  in DIMACS:
-12890  12891 -12892  768  12893 0
-12890  12891 -12892  768  12894 0
-12890  12891 -12892  768 -12895 0

c  -2-1 --> break 
c    ( b^{16, 48}_2 ∧  b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨  b^{16, 48}_0 ∨  p_768 ∨ break
c  in DIMACS:
-12890 -12891  12892  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 48}_2 ∧ -b^{16, 48}_1 ∧ -b^{16, 48}_0 ∧ true) 
c  in CNF:
c    -b^{16, 48}_2 ∨  b^{16, 48}_1 ∨  b^{16, 48}_0 ∨ false 
c  in DIMACS:
-12890  12891  12892  0

c  3 does not represent an automaton state.
c    -(-b^{16, 48}_2 ∧  b^{16, 48}_1 ∧  b^{16, 48}_0 ∧ true) 
c  in CNF:
c     b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ false 
c  in DIMACS:
 12890 -12891 -12892  0
c  -3 does not represent an automaton state.
c    -( b^{16, 48}_2 ∧  b^{16, 48}_1 ∧  b^{16, 48}_0 ∧ true) 
c  in CNF:
c    -b^{16, 48}_2 ∨ -b^{16, 48}_1 ∨ -b^{16, 48}_0 ∨ false 
c  in DIMACS:
-12890 -12891 -12892  0

c i = 49
c  -2+1 --> -1
c    ( b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧  p_784) -> ( b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0)
c  in CNF:
c    -b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨  b^{16, 50}_2
c    -b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_1
c    -b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨  b^{16, 50}_0
c  in DIMACS:
-12893 -12894  12895 -784  12896 0
-12893 -12894  12895 -784 -12897 0
-12893 -12894  12895 -784  12898 0

c  -1+1 --> 0
c    ( b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0 ∧  p_784) -> (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧ -b^{16, 50}_0)
c  in CNF:
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_2
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_1
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_0
c  in DIMACS:
-12893  12894 -12895 -784 -12896 0
-12893  12894 -12895 -784 -12897 0
-12893  12894 -12895 -784 -12898 0

c  0+1 --> 1
c    (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧  p_784) -> (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0)
c  in CNF:
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_2
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_1
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨  b^{16, 50}_0
c  in DIMACS:
 12893  12894  12895 -784 -12896 0
 12893  12894  12895 -784 -12897 0
 12893  12894  12895 -784  12898 0

c  1+1 --> 2
c    (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0 ∧  p_784) -> (-b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0)
c  in CNF:
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_2
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨  b^{16, 50}_1
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ -p_784 ∨ -b^{16, 50}_0
c  in DIMACS:
 12893  12894 -12895 -784 -12896 0
 12893  12894 -12895 -784  12897 0
 12893  12894 -12895 -784 -12898 0

c  2+1 --> break 
c    (-b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧  p_784) -> break
c  in CNF:
c     b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 12893 -12894  12895 -784 1162 0


c  2-1 --> 1
c    (-b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧ -p_784) -> (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0)
c  in CNF:
c     b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_2
c     b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_1
c     b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨  b^{16, 50}_0
c  in DIMACS:
 12893 -12894  12895  784 -12896 0
 12893 -12894  12895  784 -12897 0
 12893 -12894  12895  784  12898 0

c  1-1 --> 0
c    (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0 ∧ -p_784) -> (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧ -b^{16, 50}_0)
c  in CNF:
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_2
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_1
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_0
c  in DIMACS:
 12893  12894 -12895  784 -12896 0
 12893  12894 -12895  784 -12897 0
 12893  12894 -12895  784 -12898 0

c  0-1 --> -1
c    (-b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧ -p_784) -> ( b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0)
c  in CNF:
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨  b^{16, 50}_2
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_1
c     b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨  b^{16, 50}_0
c  in DIMACS:
 12893  12894  12895  784  12896 0
 12893  12894  12895  784 -12897 0
 12893  12894  12895  784  12898 0

c  -1-1 --> -2
c    ( b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧  b^{16, 49}_0 ∧ -p_784) -> ( b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0)
c  in CNF:
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨  b^{16, 50}_2
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨  b^{16, 50}_1
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨  p_784 ∨ -b^{16, 50}_0
c  in DIMACS:
-12893  12894 -12895  784  12896 0
-12893  12894 -12895  784  12897 0
-12893  12894 -12895  784 -12898 0

c  -2-1 --> break 
c    ( b^{16, 49}_2 ∧  b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨  b^{16, 49}_0 ∨  p_784 ∨ break
c  in DIMACS:
-12893 -12894  12895  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 49}_2 ∧ -b^{16, 49}_1 ∧ -b^{16, 49}_0 ∧ true) 
c  in CNF:
c    -b^{16, 49}_2 ∨  b^{16, 49}_1 ∨  b^{16, 49}_0 ∨ false 
c  in DIMACS:
-12893  12894  12895  0

c  3 does not represent an automaton state.
c    -(-b^{16, 49}_2 ∧  b^{16, 49}_1 ∧  b^{16, 49}_0 ∧ true) 
c  in CNF:
c     b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ false 
c  in DIMACS:
 12893 -12894 -12895  0
c  -3 does not represent an automaton state.
c    -( b^{16, 49}_2 ∧  b^{16, 49}_1 ∧  b^{16, 49}_0 ∧ true) 
c  in CNF:
c    -b^{16, 49}_2 ∨ -b^{16, 49}_1 ∨ -b^{16, 49}_0 ∨ false 
c  in DIMACS:
-12893 -12894 -12895  0

c i = 50
c  -2+1 --> -1
c    ( b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧  p_800) -> ( b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0)
c  in CNF:
c    -b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨  b^{16, 51}_2
c    -b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_1
c    -b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨  b^{16, 51}_0
c  in DIMACS:
-12896 -12897  12898 -800  12899 0
-12896 -12897  12898 -800 -12900 0
-12896 -12897  12898 -800  12901 0

c  -1+1 --> 0
c    ( b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0 ∧  p_800) -> (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧ -b^{16, 51}_0)
c  in CNF:
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_2
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_1
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_0
c  in DIMACS:
-12896  12897 -12898 -800 -12899 0
-12896  12897 -12898 -800 -12900 0
-12896  12897 -12898 -800 -12901 0

c  0+1 --> 1
c    (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧  p_800) -> (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0)
c  in CNF:
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_2
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_1
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨  b^{16, 51}_0
c  in DIMACS:
 12896  12897  12898 -800 -12899 0
 12896  12897  12898 -800 -12900 0
 12896  12897  12898 -800  12901 0

c  1+1 --> 2
c    (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0 ∧  p_800) -> (-b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0)
c  in CNF:
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_2
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨  b^{16, 51}_1
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ -p_800 ∨ -b^{16, 51}_0
c  in DIMACS:
 12896  12897 -12898 -800 -12899 0
 12896  12897 -12898 -800  12900 0
 12896  12897 -12898 -800 -12901 0

c  2+1 --> break 
c    (-b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧  p_800) -> break
c  in CNF:
c     b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 12896 -12897  12898 -800 1162 0


c  2-1 --> 1
c    (-b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧ -p_800) -> (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0)
c  in CNF:
c     b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_2
c     b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_1
c     b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨  b^{16, 51}_0
c  in DIMACS:
 12896 -12897  12898  800 -12899 0
 12896 -12897  12898  800 -12900 0
 12896 -12897  12898  800  12901 0

c  1-1 --> 0
c    (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0 ∧ -p_800) -> (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧ -b^{16, 51}_0)
c  in CNF:
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_2
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_1
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_0
c  in DIMACS:
 12896  12897 -12898  800 -12899 0
 12896  12897 -12898  800 -12900 0
 12896  12897 -12898  800 -12901 0

c  0-1 --> -1
c    (-b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧ -p_800) -> ( b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0)
c  in CNF:
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨  b^{16, 51}_2
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_1
c     b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨  b^{16, 51}_0
c  in DIMACS:
 12896  12897  12898  800  12899 0
 12896  12897  12898  800 -12900 0
 12896  12897  12898  800  12901 0

c  -1-1 --> -2
c    ( b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧  b^{16, 50}_0 ∧ -p_800) -> ( b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0)
c  in CNF:
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨  b^{16, 51}_2
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨  b^{16, 51}_1
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨  p_800 ∨ -b^{16, 51}_0
c  in DIMACS:
-12896  12897 -12898  800  12899 0
-12896  12897 -12898  800  12900 0
-12896  12897 -12898  800 -12901 0

c  -2-1 --> break 
c    ( b^{16, 50}_2 ∧  b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨  b^{16, 50}_0 ∨  p_800 ∨ break
c  in DIMACS:
-12896 -12897  12898  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 50}_2 ∧ -b^{16, 50}_1 ∧ -b^{16, 50}_0 ∧ true) 
c  in CNF:
c    -b^{16, 50}_2 ∨  b^{16, 50}_1 ∨  b^{16, 50}_0 ∨ false 
c  in DIMACS:
-12896  12897  12898  0

c  3 does not represent an automaton state.
c    -(-b^{16, 50}_2 ∧  b^{16, 50}_1 ∧  b^{16, 50}_0 ∧ true) 
c  in CNF:
c     b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ false 
c  in DIMACS:
 12896 -12897 -12898  0
c  -3 does not represent an automaton state.
c    -( b^{16, 50}_2 ∧  b^{16, 50}_1 ∧  b^{16, 50}_0 ∧ true) 
c  in CNF:
c    -b^{16, 50}_2 ∨ -b^{16, 50}_1 ∨ -b^{16, 50}_0 ∨ false 
c  in DIMACS:
-12896 -12897 -12898  0

c i = 51
c  -2+1 --> -1
c    ( b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧  p_816) -> ( b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0)
c  in CNF:
c    -b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨  b^{16, 52}_2
c    -b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_1
c    -b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨  b^{16, 52}_0
c  in DIMACS:
-12899 -12900  12901 -816  12902 0
-12899 -12900  12901 -816 -12903 0
-12899 -12900  12901 -816  12904 0

c  -1+1 --> 0
c    ( b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0 ∧  p_816) -> (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧ -b^{16, 52}_0)
c  in CNF:
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_2
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_1
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_0
c  in DIMACS:
-12899  12900 -12901 -816 -12902 0
-12899  12900 -12901 -816 -12903 0
-12899  12900 -12901 -816 -12904 0

c  0+1 --> 1
c    (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧  p_816) -> (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0)
c  in CNF:
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_2
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_1
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨  b^{16, 52}_0
c  in DIMACS:
 12899  12900  12901 -816 -12902 0
 12899  12900  12901 -816 -12903 0
 12899  12900  12901 -816  12904 0

c  1+1 --> 2
c    (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0 ∧  p_816) -> (-b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0)
c  in CNF:
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_2
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨  b^{16, 52}_1
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ -p_816 ∨ -b^{16, 52}_0
c  in DIMACS:
 12899  12900 -12901 -816 -12902 0
 12899  12900 -12901 -816  12903 0
 12899  12900 -12901 -816 -12904 0

c  2+1 --> break 
c    (-b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧  p_816) -> break
c  in CNF:
c     b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 12899 -12900  12901 -816 1162 0


c  2-1 --> 1
c    (-b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧ -p_816) -> (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0)
c  in CNF:
c     b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_2
c     b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_1
c     b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨  b^{16, 52}_0
c  in DIMACS:
 12899 -12900  12901  816 -12902 0
 12899 -12900  12901  816 -12903 0
 12899 -12900  12901  816  12904 0

c  1-1 --> 0
c    (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0 ∧ -p_816) -> (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧ -b^{16, 52}_0)
c  in CNF:
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_2
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_1
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_0
c  in DIMACS:
 12899  12900 -12901  816 -12902 0
 12899  12900 -12901  816 -12903 0
 12899  12900 -12901  816 -12904 0

c  0-1 --> -1
c    (-b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧ -p_816) -> ( b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0)
c  in CNF:
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨  b^{16, 52}_2
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_1
c     b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨  b^{16, 52}_0
c  in DIMACS:
 12899  12900  12901  816  12902 0
 12899  12900  12901  816 -12903 0
 12899  12900  12901  816  12904 0

c  -1-1 --> -2
c    ( b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧  b^{16, 51}_0 ∧ -p_816) -> ( b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0)
c  in CNF:
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨  b^{16, 52}_2
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨  b^{16, 52}_1
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨  p_816 ∨ -b^{16, 52}_0
c  in DIMACS:
-12899  12900 -12901  816  12902 0
-12899  12900 -12901  816  12903 0
-12899  12900 -12901  816 -12904 0

c  -2-1 --> break 
c    ( b^{16, 51}_2 ∧  b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨  b^{16, 51}_0 ∨  p_816 ∨ break
c  in DIMACS:
-12899 -12900  12901  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 51}_2 ∧ -b^{16, 51}_1 ∧ -b^{16, 51}_0 ∧ true) 
c  in CNF:
c    -b^{16, 51}_2 ∨  b^{16, 51}_1 ∨  b^{16, 51}_0 ∨ false 
c  in DIMACS:
-12899  12900  12901  0

c  3 does not represent an automaton state.
c    -(-b^{16, 51}_2 ∧  b^{16, 51}_1 ∧  b^{16, 51}_0 ∧ true) 
c  in CNF:
c     b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ false 
c  in DIMACS:
 12899 -12900 -12901  0
c  -3 does not represent an automaton state.
c    -( b^{16, 51}_2 ∧  b^{16, 51}_1 ∧  b^{16, 51}_0 ∧ true) 
c  in CNF:
c    -b^{16, 51}_2 ∨ -b^{16, 51}_1 ∨ -b^{16, 51}_0 ∨ false 
c  in DIMACS:
-12899 -12900 -12901  0

c i = 52
c  -2+1 --> -1
c    ( b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧  p_832) -> ( b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0)
c  in CNF:
c    -b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨  b^{16, 53}_2
c    -b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_1
c    -b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨  b^{16, 53}_0
c  in DIMACS:
-12902 -12903  12904 -832  12905 0
-12902 -12903  12904 -832 -12906 0
-12902 -12903  12904 -832  12907 0

c  -1+1 --> 0
c    ( b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0 ∧  p_832) -> (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧ -b^{16, 53}_0)
c  in CNF:
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_2
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_1
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_0
c  in DIMACS:
-12902  12903 -12904 -832 -12905 0
-12902  12903 -12904 -832 -12906 0
-12902  12903 -12904 -832 -12907 0

c  0+1 --> 1
c    (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧  p_832) -> (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0)
c  in CNF:
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_2
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_1
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨  b^{16, 53}_0
c  in DIMACS:
 12902  12903  12904 -832 -12905 0
 12902  12903  12904 -832 -12906 0
 12902  12903  12904 -832  12907 0

c  1+1 --> 2
c    (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0 ∧  p_832) -> (-b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0)
c  in CNF:
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_2
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨  b^{16, 53}_1
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ -p_832 ∨ -b^{16, 53}_0
c  in DIMACS:
 12902  12903 -12904 -832 -12905 0
 12902  12903 -12904 -832  12906 0
 12902  12903 -12904 -832 -12907 0

c  2+1 --> break 
c    (-b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧  p_832) -> break
c  in CNF:
c     b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 12902 -12903  12904 -832 1162 0


c  2-1 --> 1
c    (-b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧ -p_832) -> (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0)
c  in CNF:
c     b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_2
c     b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_1
c     b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨  b^{16, 53}_0
c  in DIMACS:
 12902 -12903  12904  832 -12905 0
 12902 -12903  12904  832 -12906 0
 12902 -12903  12904  832  12907 0

c  1-1 --> 0
c    (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0 ∧ -p_832) -> (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧ -b^{16, 53}_0)
c  in CNF:
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_2
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_1
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_0
c  in DIMACS:
 12902  12903 -12904  832 -12905 0
 12902  12903 -12904  832 -12906 0
 12902  12903 -12904  832 -12907 0

c  0-1 --> -1
c    (-b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧ -p_832) -> ( b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0)
c  in CNF:
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨  b^{16, 53}_2
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_1
c     b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨  b^{16, 53}_0
c  in DIMACS:
 12902  12903  12904  832  12905 0
 12902  12903  12904  832 -12906 0
 12902  12903  12904  832  12907 0

c  -1-1 --> -2
c    ( b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧  b^{16, 52}_0 ∧ -p_832) -> ( b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0)
c  in CNF:
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨  b^{16, 53}_2
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨  b^{16, 53}_1
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨  p_832 ∨ -b^{16, 53}_0
c  in DIMACS:
-12902  12903 -12904  832  12905 0
-12902  12903 -12904  832  12906 0
-12902  12903 -12904  832 -12907 0

c  -2-1 --> break 
c    ( b^{16, 52}_2 ∧  b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨  b^{16, 52}_0 ∨  p_832 ∨ break
c  in DIMACS:
-12902 -12903  12904  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 52}_2 ∧ -b^{16, 52}_1 ∧ -b^{16, 52}_0 ∧ true) 
c  in CNF:
c    -b^{16, 52}_2 ∨  b^{16, 52}_1 ∨  b^{16, 52}_0 ∨ false 
c  in DIMACS:
-12902  12903  12904  0

c  3 does not represent an automaton state.
c    -(-b^{16, 52}_2 ∧  b^{16, 52}_1 ∧  b^{16, 52}_0 ∧ true) 
c  in CNF:
c     b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ false 
c  in DIMACS:
 12902 -12903 -12904  0
c  -3 does not represent an automaton state.
c    -( b^{16, 52}_2 ∧  b^{16, 52}_1 ∧  b^{16, 52}_0 ∧ true) 
c  in CNF:
c    -b^{16, 52}_2 ∨ -b^{16, 52}_1 ∨ -b^{16, 52}_0 ∨ false 
c  in DIMACS:
-12902 -12903 -12904  0

c i = 53
c  -2+1 --> -1
c    ( b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧  p_848) -> ( b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0)
c  in CNF:
c    -b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨  b^{16, 54}_2
c    -b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_1
c    -b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨  b^{16, 54}_0
c  in DIMACS:
-12905 -12906  12907 -848  12908 0
-12905 -12906  12907 -848 -12909 0
-12905 -12906  12907 -848  12910 0

c  -1+1 --> 0
c    ( b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0 ∧  p_848) -> (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧ -b^{16, 54}_0)
c  in CNF:
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_2
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_1
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_0
c  in DIMACS:
-12905  12906 -12907 -848 -12908 0
-12905  12906 -12907 -848 -12909 0
-12905  12906 -12907 -848 -12910 0

c  0+1 --> 1
c    (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧  p_848) -> (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0)
c  in CNF:
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_2
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_1
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨  b^{16, 54}_0
c  in DIMACS:
 12905  12906  12907 -848 -12908 0
 12905  12906  12907 -848 -12909 0
 12905  12906  12907 -848  12910 0

c  1+1 --> 2
c    (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0 ∧  p_848) -> (-b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0)
c  in CNF:
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_2
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨  b^{16, 54}_1
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ -p_848 ∨ -b^{16, 54}_0
c  in DIMACS:
 12905  12906 -12907 -848 -12908 0
 12905  12906 -12907 -848  12909 0
 12905  12906 -12907 -848 -12910 0

c  2+1 --> break 
c    (-b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧  p_848) -> break
c  in CNF:
c     b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 12905 -12906  12907 -848 1162 0


c  2-1 --> 1
c    (-b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧ -p_848) -> (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0)
c  in CNF:
c     b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_2
c     b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_1
c     b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨  b^{16, 54}_0
c  in DIMACS:
 12905 -12906  12907  848 -12908 0
 12905 -12906  12907  848 -12909 0
 12905 -12906  12907  848  12910 0

c  1-1 --> 0
c    (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0 ∧ -p_848) -> (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧ -b^{16, 54}_0)
c  in CNF:
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_2
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_1
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_0
c  in DIMACS:
 12905  12906 -12907  848 -12908 0
 12905  12906 -12907  848 -12909 0
 12905  12906 -12907  848 -12910 0

c  0-1 --> -1
c    (-b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧ -p_848) -> ( b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0)
c  in CNF:
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨  b^{16, 54}_2
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_1
c     b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨  b^{16, 54}_0
c  in DIMACS:
 12905  12906  12907  848  12908 0
 12905  12906  12907  848 -12909 0
 12905  12906  12907  848  12910 0

c  -1-1 --> -2
c    ( b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧  b^{16, 53}_0 ∧ -p_848) -> ( b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0)
c  in CNF:
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨  b^{16, 54}_2
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨  b^{16, 54}_1
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨  p_848 ∨ -b^{16, 54}_0
c  in DIMACS:
-12905  12906 -12907  848  12908 0
-12905  12906 -12907  848  12909 0
-12905  12906 -12907  848 -12910 0

c  -2-1 --> break 
c    ( b^{16, 53}_2 ∧  b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨  b^{16, 53}_0 ∨  p_848 ∨ break
c  in DIMACS:
-12905 -12906  12907  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 53}_2 ∧ -b^{16, 53}_1 ∧ -b^{16, 53}_0 ∧ true) 
c  in CNF:
c    -b^{16, 53}_2 ∨  b^{16, 53}_1 ∨  b^{16, 53}_0 ∨ false 
c  in DIMACS:
-12905  12906  12907  0

c  3 does not represent an automaton state.
c    -(-b^{16, 53}_2 ∧  b^{16, 53}_1 ∧  b^{16, 53}_0 ∧ true) 
c  in CNF:
c     b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ false 
c  in DIMACS:
 12905 -12906 -12907  0
c  -3 does not represent an automaton state.
c    -( b^{16, 53}_2 ∧  b^{16, 53}_1 ∧  b^{16, 53}_0 ∧ true) 
c  in CNF:
c    -b^{16, 53}_2 ∨ -b^{16, 53}_1 ∨ -b^{16, 53}_0 ∨ false 
c  in DIMACS:
-12905 -12906 -12907  0

c i = 54
c  -2+1 --> -1
c    ( b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧  p_864) -> ( b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0)
c  in CNF:
c    -b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨  b^{16, 55}_2
c    -b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_1
c    -b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨  b^{16, 55}_0
c  in DIMACS:
-12908 -12909  12910 -864  12911 0
-12908 -12909  12910 -864 -12912 0
-12908 -12909  12910 -864  12913 0

c  -1+1 --> 0
c    ( b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0 ∧  p_864) -> (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧ -b^{16, 55}_0)
c  in CNF:
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_2
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_1
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_0
c  in DIMACS:
-12908  12909 -12910 -864 -12911 0
-12908  12909 -12910 -864 -12912 0
-12908  12909 -12910 -864 -12913 0

c  0+1 --> 1
c    (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧  p_864) -> (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0)
c  in CNF:
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_2
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_1
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨  b^{16, 55}_0
c  in DIMACS:
 12908  12909  12910 -864 -12911 0
 12908  12909  12910 -864 -12912 0
 12908  12909  12910 -864  12913 0

c  1+1 --> 2
c    (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0 ∧  p_864) -> (-b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0)
c  in CNF:
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_2
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨  b^{16, 55}_1
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ -p_864 ∨ -b^{16, 55}_0
c  in DIMACS:
 12908  12909 -12910 -864 -12911 0
 12908  12909 -12910 -864  12912 0
 12908  12909 -12910 -864 -12913 0

c  2+1 --> break 
c    (-b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧  p_864) -> break
c  in CNF:
c     b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 12908 -12909  12910 -864 1162 0


c  2-1 --> 1
c    (-b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧ -p_864) -> (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0)
c  in CNF:
c     b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_2
c     b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_1
c     b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨  b^{16, 55}_0
c  in DIMACS:
 12908 -12909  12910  864 -12911 0
 12908 -12909  12910  864 -12912 0
 12908 -12909  12910  864  12913 0

c  1-1 --> 0
c    (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0 ∧ -p_864) -> (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧ -b^{16, 55}_0)
c  in CNF:
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_2
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_1
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_0
c  in DIMACS:
 12908  12909 -12910  864 -12911 0
 12908  12909 -12910  864 -12912 0
 12908  12909 -12910  864 -12913 0

c  0-1 --> -1
c    (-b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧ -p_864) -> ( b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0)
c  in CNF:
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨  b^{16, 55}_2
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_1
c     b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨  b^{16, 55}_0
c  in DIMACS:
 12908  12909  12910  864  12911 0
 12908  12909  12910  864 -12912 0
 12908  12909  12910  864  12913 0

c  -1-1 --> -2
c    ( b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧  b^{16, 54}_0 ∧ -p_864) -> ( b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0)
c  in CNF:
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨  b^{16, 55}_2
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨  b^{16, 55}_1
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨  p_864 ∨ -b^{16, 55}_0
c  in DIMACS:
-12908  12909 -12910  864  12911 0
-12908  12909 -12910  864  12912 0
-12908  12909 -12910  864 -12913 0

c  -2-1 --> break 
c    ( b^{16, 54}_2 ∧  b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨  b^{16, 54}_0 ∨  p_864 ∨ break
c  in DIMACS:
-12908 -12909  12910  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 54}_2 ∧ -b^{16, 54}_1 ∧ -b^{16, 54}_0 ∧ true) 
c  in CNF:
c    -b^{16, 54}_2 ∨  b^{16, 54}_1 ∨  b^{16, 54}_0 ∨ false 
c  in DIMACS:
-12908  12909  12910  0

c  3 does not represent an automaton state.
c    -(-b^{16, 54}_2 ∧  b^{16, 54}_1 ∧  b^{16, 54}_0 ∧ true) 
c  in CNF:
c     b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ false 
c  in DIMACS:
 12908 -12909 -12910  0
c  -3 does not represent an automaton state.
c    -( b^{16, 54}_2 ∧  b^{16, 54}_1 ∧  b^{16, 54}_0 ∧ true) 
c  in CNF:
c    -b^{16, 54}_2 ∨ -b^{16, 54}_1 ∨ -b^{16, 54}_0 ∨ false 
c  in DIMACS:
-12908 -12909 -12910  0

c i = 55
c  -2+1 --> -1
c    ( b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧  p_880) -> ( b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0)
c  in CNF:
c    -b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨  b^{16, 56}_2
c    -b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_1
c    -b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨  b^{16, 56}_0
c  in DIMACS:
-12911 -12912  12913 -880  12914 0
-12911 -12912  12913 -880 -12915 0
-12911 -12912  12913 -880  12916 0

c  -1+1 --> 0
c    ( b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0 ∧  p_880) -> (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧ -b^{16, 56}_0)
c  in CNF:
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_2
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_1
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_0
c  in DIMACS:
-12911  12912 -12913 -880 -12914 0
-12911  12912 -12913 -880 -12915 0
-12911  12912 -12913 -880 -12916 0

c  0+1 --> 1
c    (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧  p_880) -> (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0)
c  in CNF:
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_2
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_1
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨  b^{16, 56}_0
c  in DIMACS:
 12911  12912  12913 -880 -12914 0
 12911  12912  12913 -880 -12915 0
 12911  12912  12913 -880  12916 0

c  1+1 --> 2
c    (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0 ∧  p_880) -> (-b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0)
c  in CNF:
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_2
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨  b^{16, 56}_1
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ -p_880 ∨ -b^{16, 56}_0
c  in DIMACS:
 12911  12912 -12913 -880 -12914 0
 12911  12912 -12913 -880  12915 0
 12911  12912 -12913 -880 -12916 0

c  2+1 --> break 
c    (-b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧  p_880) -> break
c  in CNF:
c     b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 12911 -12912  12913 -880 1162 0


c  2-1 --> 1
c    (-b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧ -p_880) -> (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0)
c  in CNF:
c     b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_2
c     b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_1
c     b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨  b^{16, 56}_0
c  in DIMACS:
 12911 -12912  12913  880 -12914 0
 12911 -12912  12913  880 -12915 0
 12911 -12912  12913  880  12916 0

c  1-1 --> 0
c    (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0 ∧ -p_880) -> (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧ -b^{16, 56}_0)
c  in CNF:
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_2
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_1
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_0
c  in DIMACS:
 12911  12912 -12913  880 -12914 0
 12911  12912 -12913  880 -12915 0
 12911  12912 -12913  880 -12916 0

c  0-1 --> -1
c    (-b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧ -p_880) -> ( b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0)
c  in CNF:
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨  b^{16, 56}_2
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_1
c     b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨  b^{16, 56}_0
c  in DIMACS:
 12911  12912  12913  880  12914 0
 12911  12912  12913  880 -12915 0
 12911  12912  12913  880  12916 0

c  -1-1 --> -2
c    ( b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧  b^{16, 55}_0 ∧ -p_880) -> ( b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0)
c  in CNF:
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨  b^{16, 56}_2
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨  b^{16, 56}_1
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨  p_880 ∨ -b^{16, 56}_0
c  in DIMACS:
-12911  12912 -12913  880  12914 0
-12911  12912 -12913  880  12915 0
-12911  12912 -12913  880 -12916 0

c  -2-1 --> break 
c    ( b^{16, 55}_2 ∧  b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨  b^{16, 55}_0 ∨  p_880 ∨ break
c  in DIMACS:
-12911 -12912  12913  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 55}_2 ∧ -b^{16, 55}_1 ∧ -b^{16, 55}_0 ∧ true) 
c  in CNF:
c    -b^{16, 55}_2 ∨  b^{16, 55}_1 ∨  b^{16, 55}_0 ∨ false 
c  in DIMACS:
-12911  12912  12913  0

c  3 does not represent an automaton state.
c    -(-b^{16, 55}_2 ∧  b^{16, 55}_1 ∧  b^{16, 55}_0 ∧ true) 
c  in CNF:
c     b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ false 
c  in DIMACS:
 12911 -12912 -12913  0
c  -3 does not represent an automaton state.
c    -( b^{16, 55}_2 ∧  b^{16, 55}_1 ∧  b^{16, 55}_0 ∧ true) 
c  in CNF:
c    -b^{16, 55}_2 ∨ -b^{16, 55}_1 ∨ -b^{16, 55}_0 ∨ false 
c  in DIMACS:
-12911 -12912 -12913  0

c i = 56
c  -2+1 --> -1
c    ( b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧  p_896) -> ( b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0)
c  in CNF:
c    -b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨  b^{16, 57}_2
c    -b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_1
c    -b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨  b^{16, 57}_0
c  in DIMACS:
-12914 -12915  12916 -896  12917 0
-12914 -12915  12916 -896 -12918 0
-12914 -12915  12916 -896  12919 0

c  -1+1 --> 0
c    ( b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0 ∧  p_896) -> (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧ -b^{16, 57}_0)
c  in CNF:
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_2
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_1
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_0
c  in DIMACS:
-12914  12915 -12916 -896 -12917 0
-12914  12915 -12916 -896 -12918 0
-12914  12915 -12916 -896 -12919 0

c  0+1 --> 1
c    (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧  p_896) -> (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0)
c  in CNF:
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_2
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_1
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨  b^{16, 57}_0
c  in DIMACS:
 12914  12915  12916 -896 -12917 0
 12914  12915  12916 -896 -12918 0
 12914  12915  12916 -896  12919 0

c  1+1 --> 2
c    (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0 ∧  p_896) -> (-b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0)
c  in CNF:
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_2
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨  b^{16, 57}_1
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ -p_896 ∨ -b^{16, 57}_0
c  in DIMACS:
 12914  12915 -12916 -896 -12917 0
 12914  12915 -12916 -896  12918 0
 12914  12915 -12916 -896 -12919 0

c  2+1 --> break 
c    (-b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧  p_896) -> break
c  in CNF:
c     b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 12914 -12915  12916 -896 1162 0


c  2-1 --> 1
c    (-b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧ -p_896) -> (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0)
c  in CNF:
c     b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_2
c     b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_1
c     b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨  b^{16, 57}_0
c  in DIMACS:
 12914 -12915  12916  896 -12917 0
 12914 -12915  12916  896 -12918 0
 12914 -12915  12916  896  12919 0

c  1-1 --> 0
c    (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0 ∧ -p_896) -> (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧ -b^{16, 57}_0)
c  in CNF:
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_2
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_1
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_0
c  in DIMACS:
 12914  12915 -12916  896 -12917 0
 12914  12915 -12916  896 -12918 0
 12914  12915 -12916  896 -12919 0

c  0-1 --> -1
c    (-b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧ -p_896) -> ( b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0)
c  in CNF:
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨  b^{16, 57}_2
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_1
c     b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨  b^{16, 57}_0
c  in DIMACS:
 12914  12915  12916  896  12917 0
 12914  12915  12916  896 -12918 0
 12914  12915  12916  896  12919 0

c  -1-1 --> -2
c    ( b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧  b^{16, 56}_0 ∧ -p_896) -> ( b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0)
c  in CNF:
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨  b^{16, 57}_2
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨  b^{16, 57}_1
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨  p_896 ∨ -b^{16, 57}_0
c  in DIMACS:
-12914  12915 -12916  896  12917 0
-12914  12915 -12916  896  12918 0
-12914  12915 -12916  896 -12919 0

c  -2-1 --> break 
c    ( b^{16, 56}_2 ∧  b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨  b^{16, 56}_0 ∨  p_896 ∨ break
c  in DIMACS:
-12914 -12915  12916  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 56}_2 ∧ -b^{16, 56}_1 ∧ -b^{16, 56}_0 ∧ true) 
c  in CNF:
c    -b^{16, 56}_2 ∨  b^{16, 56}_1 ∨  b^{16, 56}_0 ∨ false 
c  in DIMACS:
-12914  12915  12916  0

c  3 does not represent an automaton state.
c    -(-b^{16, 56}_2 ∧  b^{16, 56}_1 ∧  b^{16, 56}_0 ∧ true) 
c  in CNF:
c     b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ false 
c  in DIMACS:
 12914 -12915 -12916  0
c  -3 does not represent an automaton state.
c    -( b^{16, 56}_2 ∧  b^{16, 56}_1 ∧  b^{16, 56}_0 ∧ true) 
c  in CNF:
c    -b^{16, 56}_2 ∨ -b^{16, 56}_1 ∨ -b^{16, 56}_0 ∨ false 
c  in DIMACS:
-12914 -12915 -12916  0

c i = 57
c  -2+1 --> -1
c    ( b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧  p_912) -> ( b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0)
c  in CNF:
c    -b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨  b^{16, 58}_2
c    -b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_1
c    -b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨  b^{16, 58}_0
c  in DIMACS:
-12917 -12918  12919 -912  12920 0
-12917 -12918  12919 -912 -12921 0
-12917 -12918  12919 -912  12922 0

c  -1+1 --> 0
c    ( b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0 ∧  p_912) -> (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧ -b^{16, 58}_0)
c  in CNF:
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_2
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_1
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_0
c  in DIMACS:
-12917  12918 -12919 -912 -12920 0
-12917  12918 -12919 -912 -12921 0
-12917  12918 -12919 -912 -12922 0

c  0+1 --> 1
c    (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧  p_912) -> (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0)
c  in CNF:
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_2
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_1
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨  b^{16, 58}_0
c  in DIMACS:
 12917  12918  12919 -912 -12920 0
 12917  12918  12919 -912 -12921 0
 12917  12918  12919 -912  12922 0

c  1+1 --> 2
c    (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0 ∧  p_912) -> (-b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0)
c  in CNF:
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_2
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨  b^{16, 58}_1
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ -p_912 ∨ -b^{16, 58}_0
c  in DIMACS:
 12917  12918 -12919 -912 -12920 0
 12917  12918 -12919 -912  12921 0
 12917  12918 -12919 -912 -12922 0

c  2+1 --> break 
c    (-b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧  p_912) -> break
c  in CNF:
c     b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 12917 -12918  12919 -912 1162 0


c  2-1 --> 1
c    (-b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧ -p_912) -> (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0)
c  in CNF:
c     b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_2
c     b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_1
c     b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨  b^{16, 58}_0
c  in DIMACS:
 12917 -12918  12919  912 -12920 0
 12917 -12918  12919  912 -12921 0
 12917 -12918  12919  912  12922 0

c  1-1 --> 0
c    (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0 ∧ -p_912) -> (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧ -b^{16, 58}_0)
c  in CNF:
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_2
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_1
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_0
c  in DIMACS:
 12917  12918 -12919  912 -12920 0
 12917  12918 -12919  912 -12921 0
 12917  12918 -12919  912 -12922 0

c  0-1 --> -1
c    (-b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧ -p_912) -> ( b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0)
c  in CNF:
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨  b^{16, 58}_2
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_1
c     b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨  b^{16, 58}_0
c  in DIMACS:
 12917  12918  12919  912  12920 0
 12917  12918  12919  912 -12921 0
 12917  12918  12919  912  12922 0

c  -1-1 --> -2
c    ( b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧  b^{16, 57}_0 ∧ -p_912) -> ( b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0)
c  in CNF:
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨  b^{16, 58}_2
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨  b^{16, 58}_1
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨  p_912 ∨ -b^{16, 58}_0
c  in DIMACS:
-12917  12918 -12919  912  12920 0
-12917  12918 -12919  912  12921 0
-12917  12918 -12919  912 -12922 0

c  -2-1 --> break 
c    ( b^{16, 57}_2 ∧  b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨  b^{16, 57}_0 ∨  p_912 ∨ break
c  in DIMACS:
-12917 -12918  12919  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 57}_2 ∧ -b^{16, 57}_1 ∧ -b^{16, 57}_0 ∧ true) 
c  in CNF:
c    -b^{16, 57}_2 ∨  b^{16, 57}_1 ∨  b^{16, 57}_0 ∨ false 
c  in DIMACS:
-12917  12918  12919  0

c  3 does not represent an automaton state.
c    -(-b^{16, 57}_2 ∧  b^{16, 57}_1 ∧  b^{16, 57}_0 ∧ true) 
c  in CNF:
c     b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ false 
c  in DIMACS:
 12917 -12918 -12919  0
c  -3 does not represent an automaton state.
c    -( b^{16, 57}_2 ∧  b^{16, 57}_1 ∧  b^{16, 57}_0 ∧ true) 
c  in CNF:
c    -b^{16, 57}_2 ∨ -b^{16, 57}_1 ∨ -b^{16, 57}_0 ∨ false 
c  in DIMACS:
-12917 -12918 -12919  0

c i = 58
c  -2+1 --> -1
c    ( b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧  p_928) -> ( b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0)
c  in CNF:
c    -b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨  b^{16, 59}_2
c    -b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_1
c    -b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨  b^{16, 59}_0
c  in DIMACS:
-12920 -12921  12922 -928  12923 0
-12920 -12921  12922 -928 -12924 0
-12920 -12921  12922 -928  12925 0

c  -1+1 --> 0
c    ( b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0 ∧  p_928) -> (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧ -b^{16, 59}_0)
c  in CNF:
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_2
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_1
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_0
c  in DIMACS:
-12920  12921 -12922 -928 -12923 0
-12920  12921 -12922 -928 -12924 0
-12920  12921 -12922 -928 -12925 0

c  0+1 --> 1
c    (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧  p_928) -> (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0)
c  in CNF:
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_2
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_1
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨  b^{16, 59}_0
c  in DIMACS:
 12920  12921  12922 -928 -12923 0
 12920  12921  12922 -928 -12924 0
 12920  12921  12922 -928  12925 0

c  1+1 --> 2
c    (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0 ∧  p_928) -> (-b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0)
c  in CNF:
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_2
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨  b^{16, 59}_1
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ -p_928 ∨ -b^{16, 59}_0
c  in DIMACS:
 12920  12921 -12922 -928 -12923 0
 12920  12921 -12922 -928  12924 0
 12920  12921 -12922 -928 -12925 0

c  2+1 --> break 
c    (-b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧  p_928) -> break
c  in CNF:
c     b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 12920 -12921  12922 -928 1162 0


c  2-1 --> 1
c    (-b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧ -p_928) -> (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0)
c  in CNF:
c     b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_2
c     b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_1
c     b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨  b^{16, 59}_0
c  in DIMACS:
 12920 -12921  12922  928 -12923 0
 12920 -12921  12922  928 -12924 0
 12920 -12921  12922  928  12925 0

c  1-1 --> 0
c    (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0 ∧ -p_928) -> (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧ -b^{16, 59}_0)
c  in CNF:
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_2
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_1
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_0
c  in DIMACS:
 12920  12921 -12922  928 -12923 0
 12920  12921 -12922  928 -12924 0
 12920  12921 -12922  928 -12925 0

c  0-1 --> -1
c    (-b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧ -p_928) -> ( b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0)
c  in CNF:
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨  b^{16, 59}_2
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_1
c     b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨  b^{16, 59}_0
c  in DIMACS:
 12920  12921  12922  928  12923 0
 12920  12921  12922  928 -12924 0
 12920  12921  12922  928  12925 0

c  -1-1 --> -2
c    ( b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧  b^{16, 58}_0 ∧ -p_928) -> ( b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0)
c  in CNF:
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨  b^{16, 59}_2
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨  b^{16, 59}_1
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨  p_928 ∨ -b^{16, 59}_0
c  in DIMACS:
-12920  12921 -12922  928  12923 0
-12920  12921 -12922  928  12924 0
-12920  12921 -12922  928 -12925 0

c  -2-1 --> break 
c    ( b^{16, 58}_2 ∧  b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨  b^{16, 58}_0 ∨  p_928 ∨ break
c  in DIMACS:
-12920 -12921  12922  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 58}_2 ∧ -b^{16, 58}_1 ∧ -b^{16, 58}_0 ∧ true) 
c  in CNF:
c    -b^{16, 58}_2 ∨  b^{16, 58}_1 ∨  b^{16, 58}_0 ∨ false 
c  in DIMACS:
-12920  12921  12922  0

c  3 does not represent an automaton state.
c    -(-b^{16, 58}_2 ∧  b^{16, 58}_1 ∧  b^{16, 58}_0 ∧ true) 
c  in CNF:
c     b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ false 
c  in DIMACS:
 12920 -12921 -12922  0
c  -3 does not represent an automaton state.
c    -( b^{16, 58}_2 ∧  b^{16, 58}_1 ∧  b^{16, 58}_0 ∧ true) 
c  in CNF:
c    -b^{16, 58}_2 ∨ -b^{16, 58}_1 ∨ -b^{16, 58}_0 ∨ false 
c  in DIMACS:
-12920 -12921 -12922  0

c i = 59
c  -2+1 --> -1
c    ( b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧  p_944) -> ( b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0)
c  in CNF:
c    -b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨  b^{16, 60}_2
c    -b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_1
c    -b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨  b^{16, 60}_0
c  in DIMACS:
-12923 -12924  12925 -944  12926 0
-12923 -12924  12925 -944 -12927 0
-12923 -12924  12925 -944  12928 0

c  -1+1 --> 0
c    ( b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0 ∧  p_944) -> (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧ -b^{16, 60}_0)
c  in CNF:
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_2
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_1
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_0
c  in DIMACS:
-12923  12924 -12925 -944 -12926 0
-12923  12924 -12925 -944 -12927 0
-12923  12924 -12925 -944 -12928 0

c  0+1 --> 1
c    (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧  p_944) -> (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0)
c  in CNF:
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_2
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_1
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨  b^{16, 60}_0
c  in DIMACS:
 12923  12924  12925 -944 -12926 0
 12923  12924  12925 -944 -12927 0
 12923  12924  12925 -944  12928 0

c  1+1 --> 2
c    (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0 ∧  p_944) -> (-b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0)
c  in CNF:
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_2
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨  b^{16, 60}_1
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ -p_944 ∨ -b^{16, 60}_0
c  in DIMACS:
 12923  12924 -12925 -944 -12926 0
 12923  12924 -12925 -944  12927 0
 12923  12924 -12925 -944 -12928 0

c  2+1 --> break 
c    (-b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧  p_944) -> break
c  in CNF:
c     b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 12923 -12924  12925 -944 1162 0


c  2-1 --> 1
c    (-b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧ -p_944) -> (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0)
c  in CNF:
c     b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_2
c     b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_1
c     b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨  b^{16, 60}_0
c  in DIMACS:
 12923 -12924  12925  944 -12926 0
 12923 -12924  12925  944 -12927 0
 12923 -12924  12925  944  12928 0

c  1-1 --> 0
c    (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0 ∧ -p_944) -> (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧ -b^{16, 60}_0)
c  in CNF:
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_2
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_1
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_0
c  in DIMACS:
 12923  12924 -12925  944 -12926 0
 12923  12924 -12925  944 -12927 0
 12923  12924 -12925  944 -12928 0

c  0-1 --> -1
c    (-b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧ -p_944) -> ( b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0)
c  in CNF:
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨  b^{16, 60}_2
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_1
c     b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨  b^{16, 60}_0
c  in DIMACS:
 12923  12924  12925  944  12926 0
 12923  12924  12925  944 -12927 0
 12923  12924  12925  944  12928 0

c  -1-1 --> -2
c    ( b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧  b^{16, 59}_0 ∧ -p_944) -> ( b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0)
c  in CNF:
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨  b^{16, 60}_2
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨  b^{16, 60}_1
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨  p_944 ∨ -b^{16, 60}_0
c  in DIMACS:
-12923  12924 -12925  944  12926 0
-12923  12924 -12925  944  12927 0
-12923  12924 -12925  944 -12928 0

c  -2-1 --> break 
c    ( b^{16, 59}_2 ∧  b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨  b^{16, 59}_0 ∨  p_944 ∨ break
c  in DIMACS:
-12923 -12924  12925  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 59}_2 ∧ -b^{16, 59}_1 ∧ -b^{16, 59}_0 ∧ true) 
c  in CNF:
c    -b^{16, 59}_2 ∨  b^{16, 59}_1 ∨  b^{16, 59}_0 ∨ false 
c  in DIMACS:
-12923  12924  12925  0

c  3 does not represent an automaton state.
c    -(-b^{16, 59}_2 ∧  b^{16, 59}_1 ∧  b^{16, 59}_0 ∧ true) 
c  in CNF:
c     b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ false 
c  in DIMACS:
 12923 -12924 -12925  0
c  -3 does not represent an automaton state.
c    -( b^{16, 59}_2 ∧  b^{16, 59}_1 ∧  b^{16, 59}_0 ∧ true) 
c  in CNF:
c    -b^{16, 59}_2 ∨ -b^{16, 59}_1 ∨ -b^{16, 59}_0 ∨ false 
c  in DIMACS:
-12923 -12924 -12925  0

c i = 60
c  -2+1 --> -1
c    ( b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧  p_960) -> ( b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0)
c  in CNF:
c    -b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨  b^{16, 61}_2
c    -b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_1
c    -b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨  b^{16, 61}_0
c  in DIMACS:
-12926 -12927  12928 -960  12929 0
-12926 -12927  12928 -960 -12930 0
-12926 -12927  12928 -960  12931 0

c  -1+1 --> 0
c    ( b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0 ∧  p_960) -> (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧ -b^{16, 61}_0)
c  in CNF:
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_2
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_1
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_0
c  in DIMACS:
-12926  12927 -12928 -960 -12929 0
-12926  12927 -12928 -960 -12930 0
-12926  12927 -12928 -960 -12931 0

c  0+1 --> 1
c    (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧  p_960) -> (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0)
c  in CNF:
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_2
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_1
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨  b^{16, 61}_0
c  in DIMACS:
 12926  12927  12928 -960 -12929 0
 12926  12927  12928 -960 -12930 0
 12926  12927  12928 -960  12931 0

c  1+1 --> 2
c    (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0 ∧  p_960) -> (-b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0)
c  in CNF:
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_2
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨  b^{16, 61}_1
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ -p_960 ∨ -b^{16, 61}_0
c  in DIMACS:
 12926  12927 -12928 -960 -12929 0
 12926  12927 -12928 -960  12930 0
 12926  12927 -12928 -960 -12931 0

c  2+1 --> break 
c    (-b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧  p_960) -> break
c  in CNF:
c     b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 12926 -12927  12928 -960 1162 0


c  2-1 --> 1
c    (-b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧ -p_960) -> (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0)
c  in CNF:
c     b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_2
c     b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_1
c     b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨  b^{16, 61}_0
c  in DIMACS:
 12926 -12927  12928  960 -12929 0
 12926 -12927  12928  960 -12930 0
 12926 -12927  12928  960  12931 0

c  1-1 --> 0
c    (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0 ∧ -p_960) -> (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧ -b^{16, 61}_0)
c  in CNF:
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_2
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_1
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_0
c  in DIMACS:
 12926  12927 -12928  960 -12929 0
 12926  12927 -12928  960 -12930 0
 12926  12927 -12928  960 -12931 0

c  0-1 --> -1
c    (-b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧ -p_960) -> ( b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0)
c  in CNF:
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨  b^{16, 61}_2
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_1
c     b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨  b^{16, 61}_0
c  in DIMACS:
 12926  12927  12928  960  12929 0
 12926  12927  12928  960 -12930 0
 12926  12927  12928  960  12931 0

c  -1-1 --> -2
c    ( b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧  b^{16, 60}_0 ∧ -p_960) -> ( b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0)
c  in CNF:
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨  b^{16, 61}_2
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨  b^{16, 61}_1
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨  p_960 ∨ -b^{16, 61}_0
c  in DIMACS:
-12926  12927 -12928  960  12929 0
-12926  12927 -12928  960  12930 0
-12926  12927 -12928  960 -12931 0

c  -2-1 --> break 
c    ( b^{16, 60}_2 ∧  b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨  b^{16, 60}_0 ∨  p_960 ∨ break
c  in DIMACS:
-12926 -12927  12928  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 60}_2 ∧ -b^{16, 60}_1 ∧ -b^{16, 60}_0 ∧ true) 
c  in CNF:
c    -b^{16, 60}_2 ∨  b^{16, 60}_1 ∨  b^{16, 60}_0 ∨ false 
c  in DIMACS:
-12926  12927  12928  0

c  3 does not represent an automaton state.
c    -(-b^{16, 60}_2 ∧  b^{16, 60}_1 ∧  b^{16, 60}_0 ∧ true) 
c  in CNF:
c     b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ false 
c  in DIMACS:
 12926 -12927 -12928  0
c  -3 does not represent an automaton state.
c    -( b^{16, 60}_2 ∧  b^{16, 60}_1 ∧  b^{16, 60}_0 ∧ true) 
c  in CNF:
c    -b^{16, 60}_2 ∨ -b^{16, 60}_1 ∨ -b^{16, 60}_0 ∨ false 
c  in DIMACS:
-12926 -12927 -12928  0

c i = 61
c  -2+1 --> -1
c    ( b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧  p_976) -> ( b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0)
c  in CNF:
c    -b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨  b^{16, 62}_2
c    -b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_1
c    -b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨  b^{16, 62}_0
c  in DIMACS:
-12929 -12930  12931 -976  12932 0
-12929 -12930  12931 -976 -12933 0
-12929 -12930  12931 -976  12934 0

c  -1+1 --> 0
c    ( b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0 ∧  p_976) -> (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧ -b^{16, 62}_0)
c  in CNF:
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_2
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_1
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_0
c  in DIMACS:
-12929  12930 -12931 -976 -12932 0
-12929  12930 -12931 -976 -12933 0
-12929  12930 -12931 -976 -12934 0

c  0+1 --> 1
c    (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧  p_976) -> (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0)
c  in CNF:
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_2
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_1
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨  b^{16, 62}_0
c  in DIMACS:
 12929  12930  12931 -976 -12932 0
 12929  12930  12931 -976 -12933 0
 12929  12930  12931 -976  12934 0

c  1+1 --> 2
c    (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0 ∧  p_976) -> (-b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0)
c  in CNF:
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_2
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨  b^{16, 62}_1
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ -p_976 ∨ -b^{16, 62}_0
c  in DIMACS:
 12929  12930 -12931 -976 -12932 0
 12929  12930 -12931 -976  12933 0
 12929  12930 -12931 -976 -12934 0

c  2+1 --> break 
c    (-b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧  p_976) -> break
c  in CNF:
c     b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 12929 -12930  12931 -976 1162 0


c  2-1 --> 1
c    (-b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧ -p_976) -> (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0)
c  in CNF:
c     b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_2
c     b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_1
c     b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨  b^{16, 62}_0
c  in DIMACS:
 12929 -12930  12931  976 -12932 0
 12929 -12930  12931  976 -12933 0
 12929 -12930  12931  976  12934 0

c  1-1 --> 0
c    (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0 ∧ -p_976) -> (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧ -b^{16, 62}_0)
c  in CNF:
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_2
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_1
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_0
c  in DIMACS:
 12929  12930 -12931  976 -12932 0
 12929  12930 -12931  976 -12933 0
 12929  12930 -12931  976 -12934 0

c  0-1 --> -1
c    (-b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧ -p_976) -> ( b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0)
c  in CNF:
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨  b^{16, 62}_2
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_1
c     b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨  b^{16, 62}_0
c  in DIMACS:
 12929  12930  12931  976  12932 0
 12929  12930  12931  976 -12933 0
 12929  12930  12931  976  12934 0

c  -1-1 --> -2
c    ( b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧  b^{16, 61}_0 ∧ -p_976) -> ( b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0)
c  in CNF:
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨  b^{16, 62}_2
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨  b^{16, 62}_1
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨  p_976 ∨ -b^{16, 62}_0
c  in DIMACS:
-12929  12930 -12931  976  12932 0
-12929  12930 -12931  976  12933 0
-12929  12930 -12931  976 -12934 0

c  -2-1 --> break 
c    ( b^{16, 61}_2 ∧  b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨  b^{16, 61}_0 ∨  p_976 ∨ break
c  in DIMACS:
-12929 -12930  12931  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 61}_2 ∧ -b^{16, 61}_1 ∧ -b^{16, 61}_0 ∧ true) 
c  in CNF:
c    -b^{16, 61}_2 ∨  b^{16, 61}_1 ∨  b^{16, 61}_0 ∨ false 
c  in DIMACS:
-12929  12930  12931  0

c  3 does not represent an automaton state.
c    -(-b^{16, 61}_2 ∧  b^{16, 61}_1 ∧  b^{16, 61}_0 ∧ true) 
c  in CNF:
c     b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ false 
c  in DIMACS:
 12929 -12930 -12931  0
c  -3 does not represent an automaton state.
c    -( b^{16, 61}_2 ∧  b^{16, 61}_1 ∧  b^{16, 61}_0 ∧ true) 
c  in CNF:
c    -b^{16, 61}_2 ∨ -b^{16, 61}_1 ∨ -b^{16, 61}_0 ∨ false 
c  in DIMACS:
-12929 -12930 -12931  0

c i = 62
c  -2+1 --> -1
c    ( b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧  p_992) -> ( b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0)
c  in CNF:
c    -b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨  b^{16, 63}_2
c    -b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_1
c    -b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨  b^{16, 63}_0
c  in DIMACS:
-12932 -12933  12934 -992  12935 0
-12932 -12933  12934 -992 -12936 0
-12932 -12933  12934 -992  12937 0

c  -1+1 --> 0
c    ( b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0 ∧  p_992) -> (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧ -b^{16, 63}_0)
c  in CNF:
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_2
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_1
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_0
c  in DIMACS:
-12932  12933 -12934 -992 -12935 0
-12932  12933 -12934 -992 -12936 0
-12932  12933 -12934 -992 -12937 0

c  0+1 --> 1
c    (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧  p_992) -> (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0)
c  in CNF:
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_2
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_1
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨  b^{16, 63}_0
c  in DIMACS:
 12932  12933  12934 -992 -12935 0
 12932  12933  12934 -992 -12936 0
 12932  12933  12934 -992  12937 0

c  1+1 --> 2
c    (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0 ∧  p_992) -> (-b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0)
c  in CNF:
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_2
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨  b^{16, 63}_1
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ -p_992 ∨ -b^{16, 63}_0
c  in DIMACS:
 12932  12933 -12934 -992 -12935 0
 12932  12933 -12934 -992  12936 0
 12932  12933 -12934 -992 -12937 0

c  2+1 --> break 
c    (-b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧  p_992) -> break
c  in CNF:
c     b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 12932 -12933  12934 -992 1162 0


c  2-1 --> 1
c    (-b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧ -p_992) -> (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0)
c  in CNF:
c     b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_2
c     b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_1
c     b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨  b^{16, 63}_0
c  in DIMACS:
 12932 -12933  12934  992 -12935 0
 12932 -12933  12934  992 -12936 0
 12932 -12933  12934  992  12937 0

c  1-1 --> 0
c    (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0 ∧ -p_992) -> (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧ -b^{16, 63}_0)
c  in CNF:
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_2
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_1
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_0
c  in DIMACS:
 12932  12933 -12934  992 -12935 0
 12932  12933 -12934  992 -12936 0
 12932  12933 -12934  992 -12937 0

c  0-1 --> -1
c    (-b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧ -p_992) -> ( b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0)
c  in CNF:
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨  b^{16, 63}_2
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_1
c     b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨  b^{16, 63}_0
c  in DIMACS:
 12932  12933  12934  992  12935 0
 12932  12933  12934  992 -12936 0
 12932  12933  12934  992  12937 0

c  -1-1 --> -2
c    ( b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧  b^{16, 62}_0 ∧ -p_992) -> ( b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0)
c  in CNF:
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨  b^{16, 63}_2
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨  b^{16, 63}_1
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨  p_992 ∨ -b^{16, 63}_0
c  in DIMACS:
-12932  12933 -12934  992  12935 0
-12932  12933 -12934  992  12936 0
-12932  12933 -12934  992 -12937 0

c  -2-1 --> break 
c    ( b^{16, 62}_2 ∧  b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨  b^{16, 62}_0 ∨  p_992 ∨ break
c  in DIMACS:
-12932 -12933  12934  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 62}_2 ∧ -b^{16, 62}_1 ∧ -b^{16, 62}_0 ∧ true) 
c  in CNF:
c    -b^{16, 62}_2 ∨  b^{16, 62}_1 ∨  b^{16, 62}_0 ∨ false 
c  in DIMACS:
-12932  12933  12934  0

c  3 does not represent an automaton state.
c    -(-b^{16, 62}_2 ∧  b^{16, 62}_1 ∧  b^{16, 62}_0 ∧ true) 
c  in CNF:
c     b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ false 
c  in DIMACS:
 12932 -12933 -12934  0
c  -3 does not represent an automaton state.
c    -( b^{16, 62}_2 ∧  b^{16, 62}_1 ∧  b^{16, 62}_0 ∧ true) 
c  in CNF:
c    -b^{16, 62}_2 ∨ -b^{16, 62}_1 ∨ -b^{16, 62}_0 ∨ false 
c  in DIMACS:
-12932 -12933 -12934  0

c i = 63
c  -2+1 --> -1
c    ( b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧  p_1008) -> ( b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0)
c  in CNF:
c    -b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨  b^{16, 64}_2
c    -b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_1
c    -b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨  b^{16, 64}_0
c  in DIMACS:
-12935 -12936  12937 -1008  12938 0
-12935 -12936  12937 -1008 -12939 0
-12935 -12936  12937 -1008  12940 0

c  -1+1 --> 0
c    ( b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0 ∧  p_1008) -> (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧ -b^{16, 64}_0)
c  in CNF:
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_2
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_1
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_0
c  in DIMACS:
-12935  12936 -12937 -1008 -12938 0
-12935  12936 -12937 -1008 -12939 0
-12935  12936 -12937 -1008 -12940 0

c  0+1 --> 1
c    (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧  p_1008) -> (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0)
c  in CNF:
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_2
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_1
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨  b^{16, 64}_0
c  in DIMACS:
 12935  12936  12937 -1008 -12938 0
 12935  12936  12937 -1008 -12939 0
 12935  12936  12937 -1008  12940 0

c  1+1 --> 2
c    (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0 ∧  p_1008) -> (-b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0)
c  in CNF:
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_2
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨  b^{16, 64}_1
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ -p_1008 ∨ -b^{16, 64}_0
c  in DIMACS:
 12935  12936 -12937 -1008 -12938 0
 12935  12936 -12937 -1008  12939 0
 12935  12936 -12937 -1008 -12940 0

c  2+1 --> break 
c    (-b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 12935 -12936  12937 -1008 1162 0


c  2-1 --> 1
c    (-b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧ -p_1008) -> (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0)
c  in CNF:
c     b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_2
c     b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_1
c     b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨  b^{16, 64}_0
c  in DIMACS:
 12935 -12936  12937  1008 -12938 0
 12935 -12936  12937  1008 -12939 0
 12935 -12936  12937  1008  12940 0

c  1-1 --> 0
c    (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0 ∧ -p_1008) -> (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧ -b^{16, 64}_0)
c  in CNF:
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_2
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_1
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_0
c  in DIMACS:
 12935  12936 -12937  1008 -12938 0
 12935  12936 -12937  1008 -12939 0
 12935  12936 -12937  1008 -12940 0

c  0-1 --> -1
c    (-b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧ -p_1008) -> ( b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0)
c  in CNF:
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨  b^{16, 64}_2
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_1
c     b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨  b^{16, 64}_0
c  in DIMACS:
 12935  12936  12937  1008  12938 0
 12935  12936  12937  1008 -12939 0
 12935  12936  12937  1008  12940 0

c  -1-1 --> -2
c    ( b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧  b^{16, 63}_0 ∧ -p_1008) -> ( b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0)
c  in CNF:
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨  b^{16, 64}_2
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨  b^{16, 64}_1
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨  p_1008 ∨ -b^{16, 64}_0
c  in DIMACS:
-12935  12936 -12937  1008  12938 0
-12935  12936 -12937  1008  12939 0
-12935  12936 -12937  1008 -12940 0

c  -2-1 --> break 
c    ( b^{16, 63}_2 ∧  b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨  b^{16, 63}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-12935 -12936  12937  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 63}_2 ∧ -b^{16, 63}_1 ∧ -b^{16, 63}_0 ∧ true) 
c  in CNF:
c    -b^{16, 63}_2 ∨  b^{16, 63}_1 ∨  b^{16, 63}_0 ∨ false 
c  in DIMACS:
-12935  12936  12937  0

c  3 does not represent an automaton state.
c    -(-b^{16, 63}_2 ∧  b^{16, 63}_1 ∧  b^{16, 63}_0 ∧ true) 
c  in CNF:
c     b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ false 
c  in DIMACS:
 12935 -12936 -12937  0
c  -3 does not represent an automaton state.
c    -( b^{16, 63}_2 ∧  b^{16, 63}_1 ∧  b^{16, 63}_0 ∧ true) 
c  in CNF:
c    -b^{16, 63}_2 ∨ -b^{16, 63}_1 ∨ -b^{16, 63}_0 ∨ false 
c  in DIMACS:
-12935 -12936 -12937  0

c i = 64
c  -2+1 --> -1
c    ( b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧  p_1024) -> ( b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0)
c  in CNF:
c    -b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨  b^{16, 65}_2
c    -b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_1
c    -b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨  b^{16, 65}_0
c  in DIMACS:
-12938 -12939  12940 -1024  12941 0
-12938 -12939  12940 -1024 -12942 0
-12938 -12939  12940 -1024  12943 0

c  -1+1 --> 0
c    ( b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0 ∧  p_1024) -> (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧ -b^{16, 65}_0)
c  in CNF:
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_2
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_1
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_0
c  in DIMACS:
-12938  12939 -12940 -1024 -12941 0
-12938  12939 -12940 -1024 -12942 0
-12938  12939 -12940 -1024 -12943 0

c  0+1 --> 1
c    (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧  p_1024) -> (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0)
c  in CNF:
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_2
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_1
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨  b^{16, 65}_0
c  in DIMACS:
 12938  12939  12940 -1024 -12941 0
 12938  12939  12940 -1024 -12942 0
 12938  12939  12940 -1024  12943 0

c  1+1 --> 2
c    (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0 ∧  p_1024) -> (-b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0)
c  in CNF:
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_2
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨  b^{16, 65}_1
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ -p_1024 ∨ -b^{16, 65}_0
c  in DIMACS:
 12938  12939 -12940 -1024 -12941 0
 12938  12939 -12940 -1024  12942 0
 12938  12939 -12940 -1024 -12943 0

c  2+1 --> break 
c    (-b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 12938 -12939  12940 -1024 1162 0


c  2-1 --> 1
c    (-b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧ -p_1024) -> (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0)
c  in CNF:
c     b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_2
c     b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_1
c     b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨  b^{16, 65}_0
c  in DIMACS:
 12938 -12939  12940  1024 -12941 0
 12938 -12939  12940  1024 -12942 0
 12938 -12939  12940  1024  12943 0

c  1-1 --> 0
c    (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0 ∧ -p_1024) -> (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧ -b^{16, 65}_0)
c  in CNF:
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_2
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_1
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_0
c  in DIMACS:
 12938  12939 -12940  1024 -12941 0
 12938  12939 -12940  1024 -12942 0
 12938  12939 -12940  1024 -12943 0

c  0-1 --> -1
c    (-b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧ -p_1024) -> ( b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0)
c  in CNF:
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨  b^{16, 65}_2
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_1
c     b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨  b^{16, 65}_0
c  in DIMACS:
 12938  12939  12940  1024  12941 0
 12938  12939  12940  1024 -12942 0
 12938  12939  12940  1024  12943 0

c  -1-1 --> -2
c    ( b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧  b^{16, 64}_0 ∧ -p_1024) -> ( b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0)
c  in CNF:
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨  b^{16, 65}_2
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨  b^{16, 65}_1
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨  p_1024 ∨ -b^{16, 65}_0
c  in DIMACS:
-12938  12939 -12940  1024  12941 0
-12938  12939 -12940  1024  12942 0
-12938  12939 -12940  1024 -12943 0

c  -2-1 --> break 
c    ( b^{16, 64}_2 ∧  b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨  b^{16, 64}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-12938 -12939  12940  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 64}_2 ∧ -b^{16, 64}_1 ∧ -b^{16, 64}_0 ∧ true) 
c  in CNF:
c    -b^{16, 64}_2 ∨  b^{16, 64}_1 ∨  b^{16, 64}_0 ∨ false 
c  in DIMACS:
-12938  12939  12940  0

c  3 does not represent an automaton state.
c    -(-b^{16, 64}_2 ∧  b^{16, 64}_1 ∧  b^{16, 64}_0 ∧ true) 
c  in CNF:
c     b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ false 
c  in DIMACS:
 12938 -12939 -12940  0
c  -3 does not represent an automaton state.
c    -( b^{16, 64}_2 ∧  b^{16, 64}_1 ∧  b^{16, 64}_0 ∧ true) 
c  in CNF:
c    -b^{16, 64}_2 ∨ -b^{16, 64}_1 ∨ -b^{16, 64}_0 ∨ false 
c  in DIMACS:
-12938 -12939 -12940  0

c i = 65
c  -2+1 --> -1
c    ( b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧  p_1040) -> ( b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0)
c  in CNF:
c    -b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨  b^{16, 66}_2
c    -b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_1
c    -b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨  b^{16, 66}_0
c  in DIMACS:
-12941 -12942  12943 -1040  12944 0
-12941 -12942  12943 -1040 -12945 0
-12941 -12942  12943 -1040  12946 0

c  -1+1 --> 0
c    ( b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0 ∧  p_1040) -> (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧ -b^{16, 66}_0)
c  in CNF:
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_2
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_1
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_0
c  in DIMACS:
-12941  12942 -12943 -1040 -12944 0
-12941  12942 -12943 -1040 -12945 0
-12941  12942 -12943 -1040 -12946 0

c  0+1 --> 1
c    (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧  p_1040) -> (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0)
c  in CNF:
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_2
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_1
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨  b^{16, 66}_0
c  in DIMACS:
 12941  12942  12943 -1040 -12944 0
 12941  12942  12943 -1040 -12945 0
 12941  12942  12943 -1040  12946 0

c  1+1 --> 2
c    (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0 ∧  p_1040) -> (-b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0)
c  in CNF:
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_2
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨  b^{16, 66}_1
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ -p_1040 ∨ -b^{16, 66}_0
c  in DIMACS:
 12941  12942 -12943 -1040 -12944 0
 12941  12942 -12943 -1040  12945 0
 12941  12942 -12943 -1040 -12946 0

c  2+1 --> break 
c    (-b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 12941 -12942  12943 -1040 1162 0


c  2-1 --> 1
c    (-b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧ -p_1040) -> (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0)
c  in CNF:
c     b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_2
c     b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_1
c     b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨  b^{16, 66}_0
c  in DIMACS:
 12941 -12942  12943  1040 -12944 0
 12941 -12942  12943  1040 -12945 0
 12941 -12942  12943  1040  12946 0

c  1-1 --> 0
c    (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0 ∧ -p_1040) -> (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧ -b^{16, 66}_0)
c  in CNF:
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_2
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_1
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_0
c  in DIMACS:
 12941  12942 -12943  1040 -12944 0
 12941  12942 -12943  1040 -12945 0
 12941  12942 -12943  1040 -12946 0

c  0-1 --> -1
c    (-b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧ -p_1040) -> ( b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0)
c  in CNF:
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨  b^{16, 66}_2
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_1
c     b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨  b^{16, 66}_0
c  in DIMACS:
 12941  12942  12943  1040  12944 0
 12941  12942  12943  1040 -12945 0
 12941  12942  12943  1040  12946 0

c  -1-1 --> -2
c    ( b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧  b^{16, 65}_0 ∧ -p_1040) -> ( b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0)
c  in CNF:
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨  b^{16, 66}_2
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨  b^{16, 66}_1
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨  p_1040 ∨ -b^{16, 66}_0
c  in DIMACS:
-12941  12942 -12943  1040  12944 0
-12941  12942 -12943  1040  12945 0
-12941  12942 -12943  1040 -12946 0

c  -2-1 --> break 
c    ( b^{16, 65}_2 ∧  b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨  b^{16, 65}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-12941 -12942  12943  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 65}_2 ∧ -b^{16, 65}_1 ∧ -b^{16, 65}_0 ∧ true) 
c  in CNF:
c    -b^{16, 65}_2 ∨  b^{16, 65}_1 ∨  b^{16, 65}_0 ∨ false 
c  in DIMACS:
-12941  12942  12943  0

c  3 does not represent an automaton state.
c    -(-b^{16, 65}_2 ∧  b^{16, 65}_1 ∧  b^{16, 65}_0 ∧ true) 
c  in CNF:
c     b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ false 
c  in DIMACS:
 12941 -12942 -12943  0
c  -3 does not represent an automaton state.
c    -( b^{16, 65}_2 ∧  b^{16, 65}_1 ∧  b^{16, 65}_0 ∧ true) 
c  in CNF:
c    -b^{16, 65}_2 ∨ -b^{16, 65}_1 ∨ -b^{16, 65}_0 ∨ false 
c  in DIMACS:
-12941 -12942 -12943  0

c i = 66
c  -2+1 --> -1
c    ( b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧  p_1056) -> ( b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0)
c  in CNF:
c    -b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨  b^{16, 67}_2
c    -b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_1
c    -b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨  b^{16, 67}_0
c  in DIMACS:
-12944 -12945  12946 -1056  12947 0
-12944 -12945  12946 -1056 -12948 0
-12944 -12945  12946 -1056  12949 0

c  -1+1 --> 0
c    ( b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0 ∧  p_1056) -> (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧ -b^{16, 67}_0)
c  in CNF:
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_2
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_1
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_0
c  in DIMACS:
-12944  12945 -12946 -1056 -12947 0
-12944  12945 -12946 -1056 -12948 0
-12944  12945 -12946 -1056 -12949 0

c  0+1 --> 1
c    (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧  p_1056) -> (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0)
c  in CNF:
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_2
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_1
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨  b^{16, 67}_0
c  in DIMACS:
 12944  12945  12946 -1056 -12947 0
 12944  12945  12946 -1056 -12948 0
 12944  12945  12946 -1056  12949 0

c  1+1 --> 2
c    (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0 ∧  p_1056) -> (-b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0)
c  in CNF:
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_2
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨  b^{16, 67}_1
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ -p_1056 ∨ -b^{16, 67}_0
c  in DIMACS:
 12944  12945 -12946 -1056 -12947 0
 12944  12945 -12946 -1056  12948 0
 12944  12945 -12946 -1056 -12949 0

c  2+1 --> break 
c    (-b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 12944 -12945  12946 -1056 1162 0


c  2-1 --> 1
c    (-b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧ -p_1056) -> (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0)
c  in CNF:
c     b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_2
c     b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_1
c     b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨  b^{16, 67}_0
c  in DIMACS:
 12944 -12945  12946  1056 -12947 0
 12944 -12945  12946  1056 -12948 0
 12944 -12945  12946  1056  12949 0

c  1-1 --> 0
c    (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0 ∧ -p_1056) -> (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧ -b^{16, 67}_0)
c  in CNF:
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_2
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_1
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_0
c  in DIMACS:
 12944  12945 -12946  1056 -12947 0
 12944  12945 -12946  1056 -12948 0
 12944  12945 -12946  1056 -12949 0

c  0-1 --> -1
c    (-b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧ -p_1056) -> ( b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0)
c  in CNF:
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨  b^{16, 67}_2
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_1
c     b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨  b^{16, 67}_0
c  in DIMACS:
 12944  12945  12946  1056  12947 0
 12944  12945  12946  1056 -12948 0
 12944  12945  12946  1056  12949 0

c  -1-1 --> -2
c    ( b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧  b^{16, 66}_0 ∧ -p_1056) -> ( b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0)
c  in CNF:
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨  b^{16, 67}_2
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨  b^{16, 67}_1
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨  p_1056 ∨ -b^{16, 67}_0
c  in DIMACS:
-12944  12945 -12946  1056  12947 0
-12944  12945 -12946  1056  12948 0
-12944  12945 -12946  1056 -12949 0

c  -2-1 --> break 
c    ( b^{16, 66}_2 ∧  b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨  b^{16, 66}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-12944 -12945  12946  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 66}_2 ∧ -b^{16, 66}_1 ∧ -b^{16, 66}_0 ∧ true) 
c  in CNF:
c    -b^{16, 66}_2 ∨  b^{16, 66}_1 ∨  b^{16, 66}_0 ∨ false 
c  in DIMACS:
-12944  12945  12946  0

c  3 does not represent an automaton state.
c    -(-b^{16, 66}_2 ∧  b^{16, 66}_1 ∧  b^{16, 66}_0 ∧ true) 
c  in CNF:
c     b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ false 
c  in DIMACS:
 12944 -12945 -12946  0
c  -3 does not represent an automaton state.
c    -( b^{16, 66}_2 ∧  b^{16, 66}_1 ∧  b^{16, 66}_0 ∧ true) 
c  in CNF:
c    -b^{16, 66}_2 ∨ -b^{16, 66}_1 ∨ -b^{16, 66}_0 ∨ false 
c  in DIMACS:
-12944 -12945 -12946  0

c i = 67
c  -2+1 --> -1
c    ( b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧  p_1072) -> ( b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0)
c  in CNF:
c    -b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨  b^{16, 68}_2
c    -b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_1
c    -b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨  b^{16, 68}_0
c  in DIMACS:
-12947 -12948  12949 -1072  12950 0
-12947 -12948  12949 -1072 -12951 0
-12947 -12948  12949 -1072  12952 0

c  -1+1 --> 0
c    ( b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0 ∧  p_1072) -> (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧ -b^{16, 68}_0)
c  in CNF:
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_2
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_1
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_0
c  in DIMACS:
-12947  12948 -12949 -1072 -12950 0
-12947  12948 -12949 -1072 -12951 0
-12947  12948 -12949 -1072 -12952 0

c  0+1 --> 1
c    (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧  p_1072) -> (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0)
c  in CNF:
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_2
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_1
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨  b^{16, 68}_0
c  in DIMACS:
 12947  12948  12949 -1072 -12950 0
 12947  12948  12949 -1072 -12951 0
 12947  12948  12949 -1072  12952 0

c  1+1 --> 2
c    (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0 ∧  p_1072) -> (-b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0)
c  in CNF:
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_2
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨  b^{16, 68}_1
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ -p_1072 ∨ -b^{16, 68}_0
c  in DIMACS:
 12947  12948 -12949 -1072 -12950 0
 12947  12948 -12949 -1072  12951 0
 12947  12948 -12949 -1072 -12952 0

c  2+1 --> break 
c    (-b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 12947 -12948  12949 -1072 1162 0


c  2-1 --> 1
c    (-b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧ -p_1072) -> (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0)
c  in CNF:
c     b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_2
c     b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_1
c     b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨  b^{16, 68}_0
c  in DIMACS:
 12947 -12948  12949  1072 -12950 0
 12947 -12948  12949  1072 -12951 0
 12947 -12948  12949  1072  12952 0

c  1-1 --> 0
c    (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0 ∧ -p_1072) -> (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧ -b^{16, 68}_0)
c  in CNF:
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_2
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_1
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_0
c  in DIMACS:
 12947  12948 -12949  1072 -12950 0
 12947  12948 -12949  1072 -12951 0
 12947  12948 -12949  1072 -12952 0

c  0-1 --> -1
c    (-b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧ -p_1072) -> ( b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0)
c  in CNF:
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨  b^{16, 68}_2
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_1
c     b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨  b^{16, 68}_0
c  in DIMACS:
 12947  12948  12949  1072  12950 0
 12947  12948  12949  1072 -12951 0
 12947  12948  12949  1072  12952 0

c  -1-1 --> -2
c    ( b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧  b^{16, 67}_0 ∧ -p_1072) -> ( b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0)
c  in CNF:
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨  b^{16, 68}_2
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨  b^{16, 68}_1
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨  p_1072 ∨ -b^{16, 68}_0
c  in DIMACS:
-12947  12948 -12949  1072  12950 0
-12947  12948 -12949  1072  12951 0
-12947  12948 -12949  1072 -12952 0

c  -2-1 --> break 
c    ( b^{16, 67}_2 ∧  b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨  b^{16, 67}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-12947 -12948  12949  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 67}_2 ∧ -b^{16, 67}_1 ∧ -b^{16, 67}_0 ∧ true) 
c  in CNF:
c    -b^{16, 67}_2 ∨  b^{16, 67}_1 ∨  b^{16, 67}_0 ∨ false 
c  in DIMACS:
-12947  12948  12949  0

c  3 does not represent an automaton state.
c    -(-b^{16, 67}_2 ∧  b^{16, 67}_1 ∧  b^{16, 67}_0 ∧ true) 
c  in CNF:
c     b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ false 
c  in DIMACS:
 12947 -12948 -12949  0
c  -3 does not represent an automaton state.
c    -( b^{16, 67}_2 ∧  b^{16, 67}_1 ∧  b^{16, 67}_0 ∧ true) 
c  in CNF:
c    -b^{16, 67}_2 ∨ -b^{16, 67}_1 ∨ -b^{16, 67}_0 ∨ false 
c  in DIMACS:
-12947 -12948 -12949  0

c i = 68
c  -2+1 --> -1
c    ( b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧  p_1088) -> ( b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0)
c  in CNF:
c    -b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨  b^{16, 69}_2
c    -b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_1
c    -b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨  b^{16, 69}_0
c  in DIMACS:
-12950 -12951  12952 -1088  12953 0
-12950 -12951  12952 -1088 -12954 0
-12950 -12951  12952 -1088  12955 0

c  -1+1 --> 0
c    ( b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0 ∧  p_1088) -> (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧ -b^{16, 69}_0)
c  in CNF:
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_2
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_1
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_0
c  in DIMACS:
-12950  12951 -12952 -1088 -12953 0
-12950  12951 -12952 -1088 -12954 0
-12950  12951 -12952 -1088 -12955 0

c  0+1 --> 1
c    (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧  p_1088) -> (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0)
c  in CNF:
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_2
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_1
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨  b^{16, 69}_0
c  in DIMACS:
 12950  12951  12952 -1088 -12953 0
 12950  12951  12952 -1088 -12954 0
 12950  12951  12952 -1088  12955 0

c  1+1 --> 2
c    (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0 ∧  p_1088) -> (-b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0)
c  in CNF:
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_2
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨  b^{16, 69}_1
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ -p_1088 ∨ -b^{16, 69}_0
c  in DIMACS:
 12950  12951 -12952 -1088 -12953 0
 12950  12951 -12952 -1088  12954 0
 12950  12951 -12952 -1088 -12955 0

c  2+1 --> break 
c    (-b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 12950 -12951  12952 -1088 1162 0


c  2-1 --> 1
c    (-b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧ -p_1088) -> (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0)
c  in CNF:
c     b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_2
c     b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_1
c     b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨  b^{16, 69}_0
c  in DIMACS:
 12950 -12951  12952  1088 -12953 0
 12950 -12951  12952  1088 -12954 0
 12950 -12951  12952  1088  12955 0

c  1-1 --> 0
c    (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0 ∧ -p_1088) -> (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧ -b^{16, 69}_0)
c  in CNF:
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_2
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_1
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_0
c  in DIMACS:
 12950  12951 -12952  1088 -12953 0
 12950  12951 -12952  1088 -12954 0
 12950  12951 -12952  1088 -12955 0

c  0-1 --> -1
c    (-b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧ -p_1088) -> ( b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0)
c  in CNF:
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨  b^{16, 69}_2
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_1
c     b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨  b^{16, 69}_0
c  in DIMACS:
 12950  12951  12952  1088  12953 0
 12950  12951  12952  1088 -12954 0
 12950  12951  12952  1088  12955 0

c  -1-1 --> -2
c    ( b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧  b^{16, 68}_0 ∧ -p_1088) -> ( b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0)
c  in CNF:
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨  b^{16, 69}_2
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨  b^{16, 69}_1
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨  p_1088 ∨ -b^{16, 69}_0
c  in DIMACS:
-12950  12951 -12952  1088  12953 0
-12950  12951 -12952  1088  12954 0
-12950  12951 -12952  1088 -12955 0

c  -2-1 --> break 
c    ( b^{16, 68}_2 ∧  b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨  b^{16, 68}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-12950 -12951  12952  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 68}_2 ∧ -b^{16, 68}_1 ∧ -b^{16, 68}_0 ∧ true) 
c  in CNF:
c    -b^{16, 68}_2 ∨  b^{16, 68}_1 ∨  b^{16, 68}_0 ∨ false 
c  in DIMACS:
-12950  12951  12952  0

c  3 does not represent an automaton state.
c    -(-b^{16, 68}_2 ∧  b^{16, 68}_1 ∧  b^{16, 68}_0 ∧ true) 
c  in CNF:
c     b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ false 
c  in DIMACS:
 12950 -12951 -12952  0
c  -3 does not represent an automaton state.
c    -( b^{16, 68}_2 ∧  b^{16, 68}_1 ∧  b^{16, 68}_0 ∧ true) 
c  in CNF:
c    -b^{16, 68}_2 ∨ -b^{16, 68}_1 ∨ -b^{16, 68}_0 ∨ false 
c  in DIMACS:
-12950 -12951 -12952  0

c i = 69
c  -2+1 --> -1
c    ( b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧  p_1104) -> ( b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0)
c  in CNF:
c    -b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨  b^{16, 70}_2
c    -b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_1
c    -b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨  b^{16, 70}_0
c  in DIMACS:
-12953 -12954  12955 -1104  12956 0
-12953 -12954  12955 -1104 -12957 0
-12953 -12954  12955 -1104  12958 0

c  -1+1 --> 0
c    ( b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0 ∧  p_1104) -> (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧ -b^{16, 70}_0)
c  in CNF:
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_2
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_1
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_0
c  in DIMACS:
-12953  12954 -12955 -1104 -12956 0
-12953  12954 -12955 -1104 -12957 0
-12953  12954 -12955 -1104 -12958 0

c  0+1 --> 1
c    (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧  p_1104) -> (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0)
c  in CNF:
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_2
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_1
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨  b^{16, 70}_0
c  in DIMACS:
 12953  12954  12955 -1104 -12956 0
 12953  12954  12955 -1104 -12957 0
 12953  12954  12955 -1104  12958 0

c  1+1 --> 2
c    (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0 ∧  p_1104) -> (-b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0)
c  in CNF:
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_2
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨  b^{16, 70}_1
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ -p_1104 ∨ -b^{16, 70}_0
c  in DIMACS:
 12953  12954 -12955 -1104 -12956 0
 12953  12954 -12955 -1104  12957 0
 12953  12954 -12955 -1104 -12958 0

c  2+1 --> break 
c    (-b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 12953 -12954  12955 -1104 1162 0


c  2-1 --> 1
c    (-b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧ -p_1104) -> (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0)
c  in CNF:
c     b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_2
c     b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_1
c     b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨  b^{16, 70}_0
c  in DIMACS:
 12953 -12954  12955  1104 -12956 0
 12953 -12954  12955  1104 -12957 0
 12953 -12954  12955  1104  12958 0

c  1-1 --> 0
c    (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0 ∧ -p_1104) -> (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧ -b^{16, 70}_0)
c  in CNF:
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_2
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_1
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_0
c  in DIMACS:
 12953  12954 -12955  1104 -12956 0
 12953  12954 -12955  1104 -12957 0
 12953  12954 -12955  1104 -12958 0

c  0-1 --> -1
c    (-b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧ -p_1104) -> ( b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0)
c  in CNF:
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨  b^{16, 70}_2
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_1
c     b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨  b^{16, 70}_0
c  in DIMACS:
 12953  12954  12955  1104  12956 0
 12953  12954  12955  1104 -12957 0
 12953  12954  12955  1104  12958 0

c  -1-1 --> -2
c    ( b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧  b^{16, 69}_0 ∧ -p_1104) -> ( b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0)
c  in CNF:
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨  b^{16, 70}_2
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨  b^{16, 70}_1
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨  p_1104 ∨ -b^{16, 70}_0
c  in DIMACS:
-12953  12954 -12955  1104  12956 0
-12953  12954 -12955  1104  12957 0
-12953  12954 -12955  1104 -12958 0

c  -2-1 --> break 
c    ( b^{16, 69}_2 ∧  b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨  b^{16, 69}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-12953 -12954  12955  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 69}_2 ∧ -b^{16, 69}_1 ∧ -b^{16, 69}_0 ∧ true) 
c  in CNF:
c    -b^{16, 69}_2 ∨  b^{16, 69}_1 ∨  b^{16, 69}_0 ∨ false 
c  in DIMACS:
-12953  12954  12955  0

c  3 does not represent an automaton state.
c    -(-b^{16, 69}_2 ∧  b^{16, 69}_1 ∧  b^{16, 69}_0 ∧ true) 
c  in CNF:
c     b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ false 
c  in DIMACS:
 12953 -12954 -12955  0
c  -3 does not represent an automaton state.
c    -( b^{16, 69}_2 ∧  b^{16, 69}_1 ∧  b^{16, 69}_0 ∧ true) 
c  in CNF:
c    -b^{16, 69}_2 ∨ -b^{16, 69}_1 ∨ -b^{16, 69}_0 ∨ false 
c  in DIMACS:
-12953 -12954 -12955  0

c i = 70
c  -2+1 --> -1
c    ( b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧  p_1120) -> ( b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0)
c  in CNF:
c    -b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨  b^{16, 71}_2
c    -b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_1
c    -b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨  b^{16, 71}_0
c  in DIMACS:
-12956 -12957  12958 -1120  12959 0
-12956 -12957  12958 -1120 -12960 0
-12956 -12957  12958 -1120  12961 0

c  -1+1 --> 0
c    ( b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0 ∧  p_1120) -> (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧ -b^{16, 71}_0)
c  in CNF:
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_2
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_1
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_0
c  in DIMACS:
-12956  12957 -12958 -1120 -12959 0
-12956  12957 -12958 -1120 -12960 0
-12956  12957 -12958 -1120 -12961 0

c  0+1 --> 1
c    (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧  p_1120) -> (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0)
c  in CNF:
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_2
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_1
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨  b^{16, 71}_0
c  in DIMACS:
 12956  12957  12958 -1120 -12959 0
 12956  12957  12958 -1120 -12960 0
 12956  12957  12958 -1120  12961 0

c  1+1 --> 2
c    (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0 ∧  p_1120) -> (-b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0)
c  in CNF:
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_2
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨  b^{16, 71}_1
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ -p_1120 ∨ -b^{16, 71}_0
c  in DIMACS:
 12956  12957 -12958 -1120 -12959 0
 12956  12957 -12958 -1120  12960 0
 12956  12957 -12958 -1120 -12961 0

c  2+1 --> break 
c    (-b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 12956 -12957  12958 -1120 1162 0


c  2-1 --> 1
c    (-b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧ -p_1120) -> (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0)
c  in CNF:
c     b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_2
c     b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_1
c     b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨  b^{16, 71}_0
c  in DIMACS:
 12956 -12957  12958  1120 -12959 0
 12956 -12957  12958  1120 -12960 0
 12956 -12957  12958  1120  12961 0

c  1-1 --> 0
c    (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0 ∧ -p_1120) -> (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧ -b^{16, 71}_0)
c  in CNF:
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_2
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_1
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_0
c  in DIMACS:
 12956  12957 -12958  1120 -12959 0
 12956  12957 -12958  1120 -12960 0
 12956  12957 -12958  1120 -12961 0

c  0-1 --> -1
c    (-b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧ -p_1120) -> ( b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0)
c  in CNF:
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨  b^{16, 71}_2
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_1
c     b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨  b^{16, 71}_0
c  in DIMACS:
 12956  12957  12958  1120  12959 0
 12956  12957  12958  1120 -12960 0
 12956  12957  12958  1120  12961 0

c  -1-1 --> -2
c    ( b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧  b^{16, 70}_0 ∧ -p_1120) -> ( b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0)
c  in CNF:
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨  b^{16, 71}_2
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨  b^{16, 71}_1
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨  p_1120 ∨ -b^{16, 71}_0
c  in DIMACS:
-12956  12957 -12958  1120  12959 0
-12956  12957 -12958  1120  12960 0
-12956  12957 -12958  1120 -12961 0

c  -2-1 --> break 
c    ( b^{16, 70}_2 ∧  b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨  b^{16, 70}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-12956 -12957  12958  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 70}_2 ∧ -b^{16, 70}_1 ∧ -b^{16, 70}_0 ∧ true) 
c  in CNF:
c    -b^{16, 70}_2 ∨  b^{16, 70}_1 ∨  b^{16, 70}_0 ∨ false 
c  in DIMACS:
-12956  12957  12958  0

c  3 does not represent an automaton state.
c    -(-b^{16, 70}_2 ∧  b^{16, 70}_1 ∧  b^{16, 70}_0 ∧ true) 
c  in CNF:
c     b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ false 
c  in DIMACS:
 12956 -12957 -12958  0
c  -3 does not represent an automaton state.
c    -( b^{16, 70}_2 ∧  b^{16, 70}_1 ∧  b^{16, 70}_0 ∧ true) 
c  in CNF:
c    -b^{16, 70}_2 ∨ -b^{16, 70}_1 ∨ -b^{16, 70}_0 ∨ false 
c  in DIMACS:
-12956 -12957 -12958  0

c i = 71
c  -2+1 --> -1
c    ( b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧  p_1136) -> ( b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0)
c  in CNF:
c    -b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨  b^{16, 72}_2
c    -b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_1
c    -b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨  b^{16, 72}_0
c  in DIMACS:
-12959 -12960  12961 -1136  12962 0
-12959 -12960  12961 -1136 -12963 0
-12959 -12960  12961 -1136  12964 0

c  -1+1 --> 0
c    ( b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0 ∧  p_1136) -> (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧ -b^{16, 72}_0)
c  in CNF:
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_2
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_1
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_0
c  in DIMACS:
-12959  12960 -12961 -1136 -12962 0
-12959  12960 -12961 -1136 -12963 0
-12959  12960 -12961 -1136 -12964 0

c  0+1 --> 1
c    (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧  p_1136) -> (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0)
c  in CNF:
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_2
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_1
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨  b^{16, 72}_0
c  in DIMACS:
 12959  12960  12961 -1136 -12962 0
 12959  12960  12961 -1136 -12963 0
 12959  12960  12961 -1136  12964 0

c  1+1 --> 2
c    (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0 ∧  p_1136) -> (-b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0)
c  in CNF:
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_2
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨  b^{16, 72}_1
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ -p_1136 ∨ -b^{16, 72}_0
c  in DIMACS:
 12959  12960 -12961 -1136 -12962 0
 12959  12960 -12961 -1136  12963 0
 12959  12960 -12961 -1136 -12964 0

c  2+1 --> break 
c    (-b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 12959 -12960  12961 -1136 1162 0


c  2-1 --> 1
c    (-b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧ -p_1136) -> (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0)
c  in CNF:
c     b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_2
c     b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_1
c     b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨  b^{16, 72}_0
c  in DIMACS:
 12959 -12960  12961  1136 -12962 0
 12959 -12960  12961  1136 -12963 0
 12959 -12960  12961  1136  12964 0

c  1-1 --> 0
c    (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0 ∧ -p_1136) -> (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧ -b^{16, 72}_0)
c  in CNF:
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_2
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_1
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_0
c  in DIMACS:
 12959  12960 -12961  1136 -12962 0
 12959  12960 -12961  1136 -12963 0
 12959  12960 -12961  1136 -12964 0

c  0-1 --> -1
c    (-b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧ -p_1136) -> ( b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0)
c  in CNF:
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨  b^{16, 72}_2
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_1
c     b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨  b^{16, 72}_0
c  in DIMACS:
 12959  12960  12961  1136  12962 0
 12959  12960  12961  1136 -12963 0
 12959  12960  12961  1136  12964 0

c  -1-1 --> -2
c    ( b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧  b^{16, 71}_0 ∧ -p_1136) -> ( b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0)
c  in CNF:
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨  b^{16, 72}_2
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨  b^{16, 72}_1
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨  p_1136 ∨ -b^{16, 72}_0
c  in DIMACS:
-12959  12960 -12961  1136  12962 0
-12959  12960 -12961  1136  12963 0
-12959  12960 -12961  1136 -12964 0

c  -2-1 --> break 
c    ( b^{16, 71}_2 ∧  b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨  b^{16, 71}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-12959 -12960  12961  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 71}_2 ∧ -b^{16, 71}_1 ∧ -b^{16, 71}_0 ∧ true) 
c  in CNF:
c    -b^{16, 71}_2 ∨  b^{16, 71}_1 ∨  b^{16, 71}_0 ∨ false 
c  in DIMACS:
-12959  12960  12961  0

c  3 does not represent an automaton state.
c    -(-b^{16, 71}_2 ∧  b^{16, 71}_1 ∧  b^{16, 71}_0 ∧ true) 
c  in CNF:
c     b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ false 
c  in DIMACS:
 12959 -12960 -12961  0
c  -3 does not represent an automaton state.
c    -( b^{16, 71}_2 ∧  b^{16, 71}_1 ∧  b^{16, 71}_0 ∧ true) 
c  in CNF:
c    -b^{16, 71}_2 ∨ -b^{16, 71}_1 ∨ -b^{16, 71}_0 ∨ false 
c  in DIMACS:
-12959 -12960 -12961  0

c i = 72
c  -2+1 --> -1
c    ( b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧  p_1152) -> ( b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧  b^{16, 73}_0)
c  in CNF:
c    -b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨  b^{16, 73}_2
c    -b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_1
c    -b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨  b^{16, 73}_0
c  in DIMACS:
-12962 -12963  12964 -1152  12965 0
-12962 -12963  12964 -1152 -12966 0
-12962 -12963  12964 -1152  12967 0

c  -1+1 --> 0
c    ( b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0 ∧  p_1152) -> (-b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧ -b^{16, 73}_0)
c  in CNF:
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_2
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_1
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_0
c  in DIMACS:
-12962  12963 -12964 -1152 -12965 0
-12962  12963 -12964 -1152 -12966 0
-12962  12963 -12964 -1152 -12967 0

c  0+1 --> 1
c    (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧  p_1152) -> (-b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧  b^{16, 73}_0)
c  in CNF:
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_2
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_1
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨  b^{16, 73}_0
c  in DIMACS:
 12962  12963  12964 -1152 -12965 0
 12962  12963  12964 -1152 -12966 0
 12962  12963  12964 -1152  12967 0

c  1+1 --> 2
c    (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0 ∧  p_1152) -> (-b^{16, 73}_2 ∧  b^{16, 73}_1 ∧ -b^{16, 73}_0)
c  in CNF:
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_2
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨  b^{16, 73}_1
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ -p_1152 ∨ -b^{16, 73}_0
c  in DIMACS:
 12962  12963 -12964 -1152 -12965 0
 12962  12963 -12964 -1152  12966 0
 12962  12963 -12964 -1152 -12967 0

c  2+1 --> break 
c    (-b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 12962 -12963  12964 -1152 1162 0


c  2-1 --> 1
c    (-b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧ -p_1152) -> (-b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧  b^{16, 73}_0)
c  in CNF:
c     b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_2
c     b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_1
c     b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨  b^{16, 73}_0
c  in DIMACS:
 12962 -12963  12964  1152 -12965 0
 12962 -12963  12964  1152 -12966 0
 12962 -12963  12964  1152  12967 0

c  1-1 --> 0
c    (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0 ∧ -p_1152) -> (-b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧ -b^{16, 73}_0)
c  in CNF:
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_2
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_1
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_0
c  in DIMACS:
 12962  12963 -12964  1152 -12965 0
 12962  12963 -12964  1152 -12966 0
 12962  12963 -12964  1152 -12967 0

c  0-1 --> -1
c    (-b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧ -p_1152) -> ( b^{16, 73}_2 ∧ -b^{16, 73}_1 ∧  b^{16, 73}_0)
c  in CNF:
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨  b^{16, 73}_2
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_1
c     b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨  b^{16, 73}_0
c  in DIMACS:
 12962  12963  12964  1152  12965 0
 12962  12963  12964  1152 -12966 0
 12962  12963  12964  1152  12967 0

c  -1-1 --> -2
c    ( b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧  b^{16, 72}_0 ∧ -p_1152) -> ( b^{16, 73}_2 ∧  b^{16, 73}_1 ∧ -b^{16, 73}_0)
c  in CNF:
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨  b^{16, 73}_2
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨  b^{16, 73}_1
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨  p_1152 ∨ -b^{16, 73}_0
c  in DIMACS:
-12962  12963 -12964  1152  12965 0
-12962  12963 -12964  1152  12966 0
-12962  12963 -12964  1152 -12967 0

c  -2-1 --> break 
c    ( b^{16, 72}_2 ∧  b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨  b^{16, 72}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-12962 -12963  12964  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{16, 72}_2 ∧ -b^{16, 72}_1 ∧ -b^{16, 72}_0 ∧ true) 
c  in CNF:
c    -b^{16, 72}_2 ∨  b^{16, 72}_1 ∨  b^{16, 72}_0 ∨ false 
c  in DIMACS:
-12962  12963  12964  0

c  3 does not represent an automaton state.
c    -(-b^{16, 72}_2 ∧  b^{16, 72}_1 ∧  b^{16, 72}_0 ∧ true) 
c  in CNF:
c     b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ false 
c  in DIMACS:
 12962 -12963 -12964  0
c  -3 does not represent an automaton state.
c    -( b^{16, 72}_2 ∧  b^{16, 72}_1 ∧  b^{16, 72}_0 ∧ true) 
c  in CNF:
c    -b^{16, 72}_2 ∨ -b^{16, 72}_1 ∨ -b^{16, 72}_0 ∨ false 
c  in DIMACS:
-12962 -12963 -12964  0

c INIT for k = 17
c    -b^{17, 1}_2
c    -b^{17, 1}_1
c    -b^{17, 1}_0
c  in DIMACS:
-12968 0
-12969 0
-12970 0

c Transitions for k = 17
c i = 1
c  -2+1 --> -1
c    ( b^{17, 1}_2 ∧  b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧  p_17) -> ( b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0)
c  in CNF:
c    -b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨  b^{17, 2}_2
c    -b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_1
c    -b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨  b^{17, 2}_0
c  in DIMACS:
-12968 -12969  12970 -17  12971 0
-12968 -12969  12970 -17 -12972 0
-12968 -12969  12970 -17  12973 0

c  -1+1 --> 0
c    ( b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧  b^{17, 1}_0 ∧  p_17) -> (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧ -b^{17, 2}_0)
c  in CNF:
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_2
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_1
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_0
c  in DIMACS:
-12968  12969 -12970 -17 -12971 0
-12968  12969 -12970 -17 -12972 0
-12968  12969 -12970 -17 -12973 0

c  0+1 --> 1
c    (-b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧  p_17) -> (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0)
c  in CNF:
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_2
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_1
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨  b^{17, 2}_0
c  in DIMACS:
 12968  12969  12970 -17 -12971 0
 12968  12969  12970 -17 -12972 0
 12968  12969  12970 -17  12973 0

c  1+1 --> 2
c    (-b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧  b^{17, 1}_0 ∧  p_17) -> (-b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0)
c  in CNF:
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_2
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨  b^{17, 2}_1
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ -p_17 ∨ -b^{17, 2}_0
c  in DIMACS:
 12968  12969 -12970 -17 -12971 0
 12968  12969 -12970 -17  12972 0
 12968  12969 -12970 -17 -12973 0

c  2+1 --> break 
c    (-b^{17, 1}_2 ∧  b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧  p_17) -> break
c  in CNF:
c     b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ -p_17 ∨ break
c  in DIMACS:
 12968 -12969  12970 -17 1162 0


c  2-1 --> 1
c    (-b^{17, 1}_2 ∧  b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧ -p_17) -> (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0)
c  in CNF:
c     b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_2
c     b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_1
c     b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨  b^{17, 2}_0
c  in DIMACS:
 12968 -12969  12970  17 -12971 0
 12968 -12969  12970  17 -12972 0
 12968 -12969  12970  17  12973 0

c  1-1 --> 0
c    (-b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧  b^{17, 1}_0 ∧ -p_17) -> (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧ -b^{17, 2}_0)
c  in CNF:
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_2
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_1
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_0
c  in DIMACS:
 12968  12969 -12970  17 -12971 0
 12968  12969 -12970  17 -12972 0
 12968  12969 -12970  17 -12973 0

c  0-1 --> -1
c    (-b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧ -p_17) -> ( b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0)
c  in CNF:
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨  b^{17, 2}_2
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_1
c     b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨  b^{17, 2}_0
c  in DIMACS:
 12968  12969  12970  17  12971 0
 12968  12969  12970  17 -12972 0
 12968  12969  12970  17  12973 0

c  -1-1 --> -2
c    ( b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧  b^{17, 1}_0 ∧ -p_17) -> ( b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0)
c  in CNF:
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨  b^{17, 2}_2
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨  b^{17, 2}_1
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨  p_17 ∨ -b^{17, 2}_0
c  in DIMACS:
-12968  12969 -12970  17  12971 0
-12968  12969 -12970  17  12972 0
-12968  12969 -12970  17 -12973 0

c  -2-1 --> break 
c    ( b^{17, 1}_2 ∧  b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧ -p_17) -> break
c  in CNF:
c    -b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨  b^{17, 1}_0 ∨  p_17 ∨ break
c  in DIMACS:
-12968 -12969  12970  17 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 1}_2 ∧ -b^{17, 1}_1 ∧ -b^{17, 1}_0 ∧ true) 
c  in CNF:
c    -b^{17, 1}_2 ∨  b^{17, 1}_1 ∨  b^{17, 1}_0 ∨ false 
c  in DIMACS:
-12968  12969  12970  0

c  3 does not represent an automaton state.
c    -(-b^{17, 1}_2 ∧  b^{17, 1}_1 ∧  b^{17, 1}_0 ∧ true) 
c  in CNF:
c     b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ false 
c  in DIMACS:
 12968 -12969 -12970  0
c  -3 does not represent an automaton state.
c    -( b^{17, 1}_2 ∧  b^{17, 1}_1 ∧  b^{17, 1}_0 ∧ true) 
c  in CNF:
c    -b^{17, 1}_2 ∨ -b^{17, 1}_1 ∨ -b^{17, 1}_0 ∨ false 
c  in DIMACS:
-12968 -12969 -12970  0

c i = 2
c  -2+1 --> -1
c    ( b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧  p_34) -> ( b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0)
c  in CNF:
c    -b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨  b^{17, 3}_2
c    -b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_1
c    -b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨  b^{17, 3}_0
c  in DIMACS:
-12971 -12972  12973 -34  12974 0
-12971 -12972  12973 -34 -12975 0
-12971 -12972  12973 -34  12976 0

c  -1+1 --> 0
c    ( b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0 ∧  p_34) -> (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧ -b^{17, 3}_0)
c  in CNF:
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_2
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_1
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_0
c  in DIMACS:
-12971  12972 -12973 -34 -12974 0
-12971  12972 -12973 -34 -12975 0
-12971  12972 -12973 -34 -12976 0

c  0+1 --> 1
c    (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧  p_34) -> (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0)
c  in CNF:
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_2
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_1
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨  b^{17, 3}_0
c  in DIMACS:
 12971  12972  12973 -34 -12974 0
 12971  12972  12973 -34 -12975 0
 12971  12972  12973 -34  12976 0

c  1+1 --> 2
c    (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0 ∧  p_34) -> (-b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0)
c  in CNF:
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_2
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨  b^{17, 3}_1
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ -p_34 ∨ -b^{17, 3}_0
c  in DIMACS:
 12971  12972 -12973 -34 -12974 0
 12971  12972 -12973 -34  12975 0
 12971  12972 -12973 -34 -12976 0

c  2+1 --> break 
c    (-b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧  p_34) -> break
c  in CNF:
c     b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ -p_34 ∨ break
c  in DIMACS:
 12971 -12972  12973 -34 1162 0


c  2-1 --> 1
c    (-b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧ -p_34) -> (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0)
c  in CNF:
c     b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_2
c     b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_1
c     b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨  b^{17, 3}_0
c  in DIMACS:
 12971 -12972  12973  34 -12974 0
 12971 -12972  12973  34 -12975 0
 12971 -12972  12973  34  12976 0

c  1-1 --> 0
c    (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0 ∧ -p_34) -> (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧ -b^{17, 3}_0)
c  in CNF:
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_2
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_1
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_0
c  in DIMACS:
 12971  12972 -12973  34 -12974 0
 12971  12972 -12973  34 -12975 0
 12971  12972 -12973  34 -12976 0

c  0-1 --> -1
c    (-b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧ -p_34) -> ( b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0)
c  in CNF:
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨  b^{17, 3}_2
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_1
c     b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨  b^{17, 3}_0
c  in DIMACS:
 12971  12972  12973  34  12974 0
 12971  12972  12973  34 -12975 0
 12971  12972  12973  34  12976 0

c  -1-1 --> -2
c    ( b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧  b^{17, 2}_0 ∧ -p_34) -> ( b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0)
c  in CNF:
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨  b^{17, 3}_2
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨  b^{17, 3}_1
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨  p_34 ∨ -b^{17, 3}_0
c  in DIMACS:
-12971  12972 -12973  34  12974 0
-12971  12972 -12973  34  12975 0
-12971  12972 -12973  34 -12976 0

c  -2-1 --> break 
c    ( b^{17, 2}_2 ∧  b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧ -p_34) -> break
c  in CNF:
c    -b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨  b^{17, 2}_0 ∨  p_34 ∨ break
c  in DIMACS:
-12971 -12972  12973  34 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 2}_2 ∧ -b^{17, 2}_1 ∧ -b^{17, 2}_0 ∧ true) 
c  in CNF:
c    -b^{17, 2}_2 ∨  b^{17, 2}_1 ∨  b^{17, 2}_0 ∨ false 
c  in DIMACS:
-12971  12972  12973  0

c  3 does not represent an automaton state.
c    -(-b^{17, 2}_2 ∧  b^{17, 2}_1 ∧  b^{17, 2}_0 ∧ true) 
c  in CNF:
c     b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ false 
c  in DIMACS:
 12971 -12972 -12973  0
c  -3 does not represent an automaton state.
c    -( b^{17, 2}_2 ∧  b^{17, 2}_1 ∧  b^{17, 2}_0 ∧ true) 
c  in CNF:
c    -b^{17, 2}_2 ∨ -b^{17, 2}_1 ∨ -b^{17, 2}_0 ∨ false 
c  in DIMACS:
-12971 -12972 -12973  0

c i = 3
c  -2+1 --> -1
c    ( b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧  p_51) -> ( b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0)
c  in CNF:
c    -b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨  b^{17, 4}_2
c    -b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_1
c    -b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨  b^{17, 4}_0
c  in DIMACS:
-12974 -12975  12976 -51  12977 0
-12974 -12975  12976 -51 -12978 0
-12974 -12975  12976 -51  12979 0

c  -1+1 --> 0
c    ( b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0 ∧  p_51) -> (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧ -b^{17, 4}_0)
c  in CNF:
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_2
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_1
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_0
c  in DIMACS:
-12974  12975 -12976 -51 -12977 0
-12974  12975 -12976 -51 -12978 0
-12974  12975 -12976 -51 -12979 0

c  0+1 --> 1
c    (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧  p_51) -> (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0)
c  in CNF:
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_2
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_1
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨  b^{17, 4}_0
c  in DIMACS:
 12974  12975  12976 -51 -12977 0
 12974  12975  12976 -51 -12978 0
 12974  12975  12976 -51  12979 0

c  1+1 --> 2
c    (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0 ∧  p_51) -> (-b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0)
c  in CNF:
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_2
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨  b^{17, 4}_1
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ -p_51 ∨ -b^{17, 4}_0
c  in DIMACS:
 12974  12975 -12976 -51 -12977 0
 12974  12975 -12976 -51  12978 0
 12974  12975 -12976 -51 -12979 0

c  2+1 --> break 
c    (-b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧  p_51) -> break
c  in CNF:
c     b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ -p_51 ∨ break
c  in DIMACS:
 12974 -12975  12976 -51 1162 0


c  2-1 --> 1
c    (-b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧ -p_51) -> (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0)
c  in CNF:
c     b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_2
c     b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_1
c     b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨  b^{17, 4}_0
c  in DIMACS:
 12974 -12975  12976  51 -12977 0
 12974 -12975  12976  51 -12978 0
 12974 -12975  12976  51  12979 0

c  1-1 --> 0
c    (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0 ∧ -p_51) -> (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧ -b^{17, 4}_0)
c  in CNF:
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_2
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_1
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_0
c  in DIMACS:
 12974  12975 -12976  51 -12977 0
 12974  12975 -12976  51 -12978 0
 12974  12975 -12976  51 -12979 0

c  0-1 --> -1
c    (-b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧ -p_51) -> ( b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0)
c  in CNF:
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨  b^{17, 4}_2
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_1
c     b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨  b^{17, 4}_0
c  in DIMACS:
 12974  12975  12976  51  12977 0
 12974  12975  12976  51 -12978 0
 12974  12975  12976  51  12979 0

c  -1-1 --> -2
c    ( b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧  b^{17, 3}_0 ∧ -p_51) -> ( b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0)
c  in CNF:
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨  b^{17, 4}_2
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨  b^{17, 4}_1
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨  p_51 ∨ -b^{17, 4}_0
c  in DIMACS:
-12974  12975 -12976  51  12977 0
-12974  12975 -12976  51  12978 0
-12974  12975 -12976  51 -12979 0

c  -2-1 --> break 
c    ( b^{17, 3}_2 ∧  b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧ -p_51) -> break
c  in CNF:
c    -b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨  b^{17, 3}_0 ∨  p_51 ∨ break
c  in DIMACS:
-12974 -12975  12976  51 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 3}_2 ∧ -b^{17, 3}_1 ∧ -b^{17, 3}_0 ∧ true) 
c  in CNF:
c    -b^{17, 3}_2 ∨  b^{17, 3}_1 ∨  b^{17, 3}_0 ∨ false 
c  in DIMACS:
-12974  12975  12976  0

c  3 does not represent an automaton state.
c    -(-b^{17, 3}_2 ∧  b^{17, 3}_1 ∧  b^{17, 3}_0 ∧ true) 
c  in CNF:
c     b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ false 
c  in DIMACS:
 12974 -12975 -12976  0
c  -3 does not represent an automaton state.
c    -( b^{17, 3}_2 ∧  b^{17, 3}_1 ∧  b^{17, 3}_0 ∧ true) 
c  in CNF:
c    -b^{17, 3}_2 ∨ -b^{17, 3}_1 ∨ -b^{17, 3}_0 ∨ false 
c  in DIMACS:
-12974 -12975 -12976  0

c i = 4
c  -2+1 --> -1
c    ( b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧  p_68) -> ( b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0)
c  in CNF:
c    -b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨  b^{17, 5}_2
c    -b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_1
c    -b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨  b^{17, 5}_0
c  in DIMACS:
-12977 -12978  12979 -68  12980 0
-12977 -12978  12979 -68 -12981 0
-12977 -12978  12979 -68  12982 0

c  -1+1 --> 0
c    ( b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0 ∧  p_68) -> (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧ -b^{17, 5}_0)
c  in CNF:
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_2
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_1
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_0
c  in DIMACS:
-12977  12978 -12979 -68 -12980 0
-12977  12978 -12979 -68 -12981 0
-12977  12978 -12979 -68 -12982 0

c  0+1 --> 1
c    (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧  p_68) -> (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0)
c  in CNF:
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_2
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_1
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨  b^{17, 5}_0
c  in DIMACS:
 12977  12978  12979 -68 -12980 0
 12977  12978  12979 -68 -12981 0
 12977  12978  12979 -68  12982 0

c  1+1 --> 2
c    (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0 ∧  p_68) -> (-b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0)
c  in CNF:
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_2
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨  b^{17, 5}_1
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ -p_68 ∨ -b^{17, 5}_0
c  in DIMACS:
 12977  12978 -12979 -68 -12980 0
 12977  12978 -12979 -68  12981 0
 12977  12978 -12979 -68 -12982 0

c  2+1 --> break 
c    (-b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧  p_68) -> break
c  in CNF:
c     b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 12977 -12978  12979 -68 1162 0


c  2-1 --> 1
c    (-b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧ -p_68) -> (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0)
c  in CNF:
c     b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_2
c     b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_1
c     b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨  b^{17, 5}_0
c  in DIMACS:
 12977 -12978  12979  68 -12980 0
 12977 -12978  12979  68 -12981 0
 12977 -12978  12979  68  12982 0

c  1-1 --> 0
c    (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0 ∧ -p_68) -> (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧ -b^{17, 5}_0)
c  in CNF:
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_2
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_1
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_0
c  in DIMACS:
 12977  12978 -12979  68 -12980 0
 12977  12978 -12979  68 -12981 0
 12977  12978 -12979  68 -12982 0

c  0-1 --> -1
c    (-b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧ -p_68) -> ( b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0)
c  in CNF:
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨  b^{17, 5}_2
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_1
c     b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨  b^{17, 5}_0
c  in DIMACS:
 12977  12978  12979  68  12980 0
 12977  12978  12979  68 -12981 0
 12977  12978  12979  68  12982 0

c  -1-1 --> -2
c    ( b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧  b^{17, 4}_0 ∧ -p_68) -> ( b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0)
c  in CNF:
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨  b^{17, 5}_2
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨  b^{17, 5}_1
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨  p_68 ∨ -b^{17, 5}_0
c  in DIMACS:
-12977  12978 -12979  68  12980 0
-12977  12978 -12979  68  12981 0
-12977  12978 -12979  68 -12982 0

c  -2-1 --> break 
c    ( b^{17, 4}_2 ∧  b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨  b^{17, 4}_0 ∨  p_68 ∨ break
c  in DIMACS:
-12977 -12978  12979  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 4}_2 ∧ -b^{17, 4}_1 ∧ -b^{17, 4}_0 ∧ true) 
c  in CNF:
c    -b^{17, 4}_2 ∨  b^{17, 4}_1 ∨  b^{17, 4}_0 ∨ false 
c  in DIMACS:
-12977  12978  12979  0

c  3 does not represent an automaton state.
c    -(-b^{17, 4}_2 ∧  b^{17, 4}_1 ∧  b^{17, 4}_0 ∧ true) 
c  in CNF:
c     b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ false 
c  in DIMACS:
 12977 -12978 -12979  0
c  -3 does not represent an automaton state.
c    -( b^{17, 4}_2 ∧  b^{17, 4}_1 ∧  b^{17, 4}_0 ∧ true) 
c  in CNF:
c    -b^{17, 4}_2 ∨ -b^{17, 4}_1 ∨ -b^{17, 4}_0 ∨ false 
c  in DIMACS:
-12977 -12978 -12979  0

c i = 5
c  -2+1 --> -1
c    ( b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧  p_85) -> ( b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0)
c  in CNF:
c    -b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨  b^{17, 6}_2
c    -b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_1
c    -b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨  b^{17, 6}_0
c  in DIMACS:
-12980 -12981  12982 -85  12983 0
-12980 -12981  12982 -85 -12984 0
-12980 -12981  12982 -85  12985 0

c  -1+1 --> 0
c    ( b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0 ∧  p_85) -> (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧ -b^{17, 6}_0)
c  in CNF:
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_2
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_1
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_0
c  in DIMACS:
-12980  12981 -12982 -85 -12983 0
-12980  12981 -12982 -85 -12984 0
-12980  12981 -12982 -85 -12985 0

c  0+1 --> 1
c    (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧  p_85) -> (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0)
c  in CNF:
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_2
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_1
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨  b^{17, 6}_0
c  in DIMACS:
 12980  12981  12982 -85 -12983 0
 12980  12981  12982 -85 -12984 0
 12980  12981  12982 -85  12985 0

c  1+1 --> 2
c    (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0 ∧  p_85) -> (-b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0)
c  in CNF:
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_2
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨  b^{17, 6}_1
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ -p_85 ∨ -b^{17, 6}_0
c  in DIMACS:
 12980  12981 -12982 -85 -12983 0
 12980  12981 -12982 -85  12984 0
 12980  12981 -12982 -85 -12985 0

c  2+1 --> break 
c    (-b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧  p_85) -> break
c  in CNF:
c     b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ -p_85 ∨ break
c  in DIMACS:
 12980 -12981  12982 -85 1162 0


c  2-1 --> 1
c    (-b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧ -p_85) -> (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0)
c  in CNF:
c     b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_2
c     b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_1
c     b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨  b^{17, 6}_0
c  in DIMACS:
 12980 -12981  12982  85 -12983 0
 12980 -12981  12982  85 -12984 0
 12980 -12981  12982  85  12985 0

c  1-1 --> 0
c    (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0 ∧ -p_85) -> (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧ -b^{17, 6}_0)
c  in CNF:
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_2
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_1
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_0
c  in DIMACS:
 12980  12981 -12982  85 -12983 0
 12980  12981 -12982  85 -12984 0
 12980  12981 -12982  85 -12985 0

c  0-1 --> -1
c    (-b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧ -p_85) -> ( b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0)
c  in CNF:
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨  b^{17, 6}_2
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_1
c     b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨  b^{17, 6}_0
c  in DIMACS:
 12980  12981  12982  85  12983 0
 12980  12981  12982  85 -12984 0
 12980  12981  12982  85  12985 0

c  -1-1 --> -2
c    ( b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧  b^{17, 5}_0 ∧ -p_85) -> ( b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0)
c  in CNF:
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨  b^{17, 6}_2
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨  b^{17, 6}_1
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨  p_85 ∨ -b^{17, 6}_0
c  in DIMACS:
-12980  12981 -12982  85  12983 0
-12980  12981 -12982  85  12984 0
-12980  12981 -12982  85 -12985 0

c  -2-1 --> break 
c    ( b^{17, 5}_2 ∧  b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧ -p_85) -> break
c  in CNF:
c    -b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨  b^{17, 5}_0 ∨  p_85 ∨ break
c  in DIMACS:
-12980 -12981  12982  85 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 5}_2 ∧ -b^{17, 5}_1 ∧ -b^{17, 5}_0 ∧ true) 
c  in CNF:
c    -b^{17, 5}_2 ∨  b^{17, 5}_1 ∨  b^{17, 5}_0 ∨ false 
c  in DIMACS:
-12980  12981  12982  0

c  3 does not represent an automaton state.
c    -(-b^{17, 5}_2 ∧  b^{17, 5}_1 ∧  b^{17, 5}_0 ∧ true) 
c  in CNF:
c     b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ false 
c  in DIMACS:
 12980 -12981 -12982  0
c  -3 does not represent an automaton state.
c    -( b^{17, 5}_2 ∧  b^{17, 5}_1 ∧  b^{17, 5}_0 ∧ true) 
c  in CNF:
c    -b^{17, 5}_2 ∨ -b^{17, 5}_1 ∨ -b^{17, 5}_0 ∨ false 
c  in DIMACS:
-12980 -12981 -12982  0

c i = 6
c  -2+1 --> -1
c    ( b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧  p_102) -> ( b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0)
c  in CNF:
c    -b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨  b^{17, 7}_2
c    -b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_1
c    -b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨  b^{17, 7}_0
c  in DIMACS:
-12983 -12984  12985 -102  12986 0
-12983 -12984  12985 -102 -12987 0
-12983 -12984  12985 -102  12988 0

c  -1+1 --> 0
c    ( b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0 ∧  p_102) -> (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧ -b^{17, 7}_0)
c  in CNF:
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_2
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_1
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_0
c  in DIMACS:
-12983  12984 -12985 -102 -12986 0
-12983  12984 -12985 -102 -12987 0
-12983  12984 -12985 -102 -12988 0

c  0+1 --> 1
c    (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧  p_102) -> (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0)
c  in CNF:
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_2
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_1
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨  b^{17, 7}_0
c  in DIMACS:
 12983  12984  12985 -102 -12986 0
 12983  12984  12985 -102 -12987 0
 12983  12984  12985 -102  12988 0

c  1+1 --> 2
c    (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0 ∧  p_102) -> (-b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0)
c  in CNF:
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_2
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨  b^{17, 7}_1
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ -p_102 ∨ -b^{17, 7}_0
c  in DIMACS:
 12983  12984 -12985 -102 -12986 0
 12983  12984 -12985 -102  12987 0
 12983  12984 -12985 -102 -12988 0

c  2+1 --> break 
c    (-b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧  p_102) -> break
c  in CNF:
c     b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 12983 -12984  12985 -102 1162 0


c  2-1 --> 1
c    (-b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧ -p_102) -> (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0)
c  in CNF:
c     b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_2
c     b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_1
c     b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨  b^{17, 7}_0
c  in DIMACS:
 12983 -12984  12985  102 -12986 0
 12983 -12984  12985  102 -12987 0
 12983 -12984  12985  102  12988 0

c  1-1 --> 0
c    (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0 ∧ -p_102) -> (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧ -b^{17, 7}_0)
c  in CNF:
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_2
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_1
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_0
c  in DIMACS:
 12983  12984 -12985  102 -12986 0
 12983  12984 -12985  102 -12987 0
 12983  12984 -12985  102 -12988 0

c  0-1 --> -1
c    (-b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧ -p_102) -> ( b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0)
c  in CNF:
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨  b^{17, 7}_2
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_1
c     b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨  b^{17, 7}_0
c  in DIMACS:
 12983  12984  12985  102  12986 0
 12983  12984  12985  102 -12987 0
 12983  12984  12985  102  12988 0

c  -1-1 --> -2
c    ( b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧  b^{17, 6}_0 ∧ -p_102) -> ( b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0)
c  in CNF:
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨  b^{17, 7}_2
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨  b^{17, 7}_1
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨  p_102 ∨ -b^{17, 7}_0
c  in DIMACS:
-12983  12984 -12985  102  12986 0
-12983  12984 -12985  102  12987 0
-12983  12984 -12985  102 -12988 0

c  -2-1 --> break 
c    ( b^{17, 6}_2 ∧  b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨  b^{17, 6}_0 ∨  p_102 ∨ break
c  in DIMACS:
-12983 -12984  12985  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 6}_2 ∧ -b^{17, 6}_1 ∧ -b^{17, 6}_0 ∧ true) 
c  in CNF:
c    -b^{17, 6}_2 ∨  b^{17, 6}_1 ∨  b^{17, 6}_0 ∨ false 
c  in DIMACS:
-12983  12984  12985  0

c  3 does not represent an automaton state.
c    -(-b^{17, 6}_2 ∧  b^{17, 6}_1 ∧  b^{17, 6}_0 ∧ true) 
c  in CNF:
c     b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ false 
c  in DIMACS:
 12983 -12984 -12985  0
c  -3 does not represent an automaton state.
c    -( b^{17, 6}_2 ∧  b^{17, 6}_1 ∧  b^{17, 6}_0 ∧ true) 
c  in CNF:
c    -b^{17, 6}_2 ∨ -b^{17, 6}_1 ∨ -b^{17, 6}_0 ∨ false 
c  in DIMACS:
-12983 -12984 -12985  0

c i = 7
c  -2+1 --> -1
c    ( b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧  p_119) -> ( b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0)
c  in CNF:
c    -b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨  b^{17, 8}_2
c    -b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_1
c    -b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨  b^{17, 8}_0
c  in DIMACS:
-12986 -12987  12988 -119  12989 0
-12986 -12987  12988 -119 -12990 0
-12986 -12987  12988 -119  12991 0

c  -1+1 --> 0
c    ( b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0 ∧  p_119) -> (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧ -b^{17, 8}_0)
c  in CNF:
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_2
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_1
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_0
c  in DIMACS:
-12986  12987 -12988 -119 -12989 0
-12986  12987 -12988 -119 -12990 0
-12986  12987 -12988 -119 -12991 0

c  0+1 --> 1
c    (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧  p_119) -> (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0)
c  in CNF:
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_2
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_1
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨  b^{17, 8}_0
c  in DIMACS:
 12986  12987  12988 -119 -12989 0
 12986  12987  12988 -119 -12990 0
 12986  12987  12988 -119  12991 0

c  1+1 --> 2
c    (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0 ∧  p_119) -> (-b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0)
c  in CNF:
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_2
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨  b^{17, 8}_1
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ -p_119 ∨ -b^{17, 8}_0
c  in DIMACS:
 12986  12987 -12988 -119 -12989 0
 12986  12987 -12988 -119  12990 0
 12986  12987 -12988 -119 -12991 0

c  2+1 --> break 
c    (-b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧  p_119) -> break
c  in CNF:
c     b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ -p_119 ∨ break
c  in DIMACS:
 12986 -12987  12988 -119 1162 0


c  2-1 --> 1
c    (-b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧ -p_119) -> (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0)
c  in CNF:
c     b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_2
c     b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_1
c     b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨  b^{17, 8}_0
c  in DIMACS:
 12986 -12987  12988  119 -12989 0
 12986 -12987  12988  119 -12990 0
 12986 -12987  12988  119  12991 0

c  1-1 --> 0
c    (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0 ∧ -p_119) -> (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧ -b^{17, 8}_0)
c  in CNF:
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_2
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_1
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_0
c  in DIMACS:
 12986  12987 -12988  119 -12989 0
 12986  12987 -12988  119 -12990 0
 12986  12987 -12988  119 -12991 0

c  0-1 --> -1
c    (-b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧ -p_119) -> ( b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0)
c  in CNF:
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨  b^{17, 8}_2
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_1
c     b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨  b^{17, 8}_0
c  in DIMACS:
 12986  12987  12988  119  12989 0
 12986  12987  12988  119 -12990 0
 12986  12987  12988  119  12991 0

c  -1-1 --> -2
c    ( b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧  b^{17, 7}_0 ∧ -p_119) -> ( b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0)
c  in CNF:
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨  b^{17, 8}_2
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨  b^{17, 8}_1
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨  p_119 ∨ -b^{17, 8}_0
c  in DIMACS:
-12986  12987 -12988  119  12989 0
-12986  12987 -12988  119  12990 0
-12986  12987 -12988  119 -12991 0

c  -2-1 --> break 
c    ( b^{17, 7}_2 ∧  b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧ -p_119) -> break
c  in CNF:
c    -b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨  b^{17, 7}_0 ∨  p_119 ∨ break
c  in DIMACS:
-12986 -12987  12988  119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 7}_2 ∧ -b^{17, 7}_1 ∧ -b^{17, 7}_0 ∧ true) 
c  in CNF:
c    -b^{17, 7}_2 ∨  b^{17, 7}_1 ∨  b^{17, 7}_0 ∨ false 
c  in DIMACS:
-12986  12987  12988  0

c  3 does not represent an automaton state.
c    -(-b^{17, 7}_2 ∧  b^{17, 7}_1 ∧  b^{17, 7}_0 ∧ true) 
c  in CNF:
c     b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ false 
c  in DIMACS:
 12986 -12987 -12988  0
c  -3 does not represent an automaton state.
c    -( b^{17, 7}_2 ∧  b^{17, 7}_1 ∧  b^{17, 7}_0 ∧ true) 
c  in CNF:
c    -b^{17, 7}_2 ∨ -b^{17, 7}_1 ∨ -b^{17, 7}_0 ∨ false 
c  in DIMACS:
-12986 -12987 -12988  0

c i = 8
c  -2+1 --> -1
c    ( b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧  p_136) -> ( b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0)
c  in CNF:
c    -b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨  b^{17, 9}_2
c    -b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_1
c    -b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨  b^{17, 9}_0
c  in DIMACS:
-12989 -12990  12991 -136  12992 0
-12989 -12990  12991 -136 -12993 0
-12989 -12990  12991 -136  12994 0

c  -1+1 --> 0
c    ( b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0 ∧  p_136) -> (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧ -b^{17, 9}_0)
c  in CNF:
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_2
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_1
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_0
c  in DIMACS:
-12989  12990 -12991 -136 -12992 0
-12989  12990 -12991 -136 -12993 0
-12989  12990 -12991 -136 -12994 0

c  0+1 --> 1
c    (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧  p_136) -> (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0)
c  in CNF:
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_2
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_1
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨  b^{17, 9}_0
c  in DIMACS:
 12989  12990  12991 -136 -12992 0
 12989  12990  12991 -136 -12993 0
 12989  12990  12991 -136  12994 0

c  1+1 --> 2
c    (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0 ∧  p_136) -> (-b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0)
c  in CNF:
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_2
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨  b^{17, 9}_1
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ -p_136 ∨ -b^{17, 9}_0
c  in DIMACS:
 12989  12990 -12991 -136 -12992 0
 12989  12990 -12991 -136  12993 0
 12989  12990 -12991 -136 -12994 0

c  2+1 --> break 
c    (-b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧  p_136) -> break
c  in CNF:
c     b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 12989 -12990  12991 -136 1162 0


c  2-1 --> 1
c    (-b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧ -p_136) -> (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0)
c  in CNF:
c     b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_2
c     b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_1
c     b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨  b^{17, 9}_0
c  in DIMACS:
 12989 -12990  12991  136 -12992 0
 12989 -12990  12991  136 -12993 0
 12989 -12990  12991  136  12994 0

c  1-1 --> 0
c    (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0 ∧ -p_136) -> (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧ -b^{17, 9}_0)
c  in CNF:
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_2
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_1
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_0
c  in DIMACS:
 12989  12990 -12991  136 -12992 0
 12989  12990 -12991  136 -12993 0
 12989  12990 -12991  136 -12994 0

c  0-1 --> -1
c    (-b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧ -p_136) -> ( b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0)
c  in CNF:
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨  b^{17, 9}_2
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_1
c     b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨  b^{17, 9}_0
c  in DIMACS:
 12989  12990  12991  136  12992 0
 12989  12990  12991  136 -12993 0
 12989  12990  12991  136  12994 0

c  -1-1 --> -2
c    ( b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧  b^{17, 8}_0 ∧ -p_136) -> ( b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0)
c  in CNF:
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨  b^{17, 9}_2
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨  b^{17, 9}_1
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨  p_136 ∨ -b^{17, 9}_0
c  in DIMACS:
-12989  12990 -12991  136  12992 0
-12989  12990 -12991  136  12993 0
-12989  12990 -12991  136 -12994 0

c  -2-1 --> break 
c    ( b^{17, 8}_2 ∧  b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨  b^{17, 8}_0 ∨  p_136 ∨ break
c  in DIMACS:
-12989 -12990  12991  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 8}_2 ∧ -b^{17, 8}_1 ∧ -b^{17, 8}_0 ∧ true) 
c  in CNF:
c    -b^{17, 8}_2 ∨  b^{17, 8}_1 ∨  b^{17, 8}_0 ∨ false 
c  in DIMACS:
-12989  12990  12991  0

c  3 does not represent an automaton state.
c    -(-b^{17, 8}_2 ∧  b^{17, 8}_1 ∧  b^{17, 8}_0 ∧ true) 
c  in CNF:
c     b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ false 
c  in DIMACS:
 12989 -12990 -12991  0
c  -3 does not represent an automaton state.
c    -( b^{17, 8}_2 ∧  b^{17, 8}_1 ∧  b^{17, 8}_0 ∧ true) 
c  in CNF:
c    -b^{17, 8}_2 ∨ -b^{17, 8}_1 ∨ -b^{17, 8}_0 ∨ false 
c  in DIMACS:
-12989 -12990 -12991  0

c i = 9
c  -2+1 --> -1
c    ( b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧  p_153) -> ( b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0)
c  in CNF:
c    -b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨  b^{17, 10}_2
c    -b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_1
c    -b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨  b^{17, 10}_0
c  in DIMACS:
-12992 -12993  12994 -153  12995 0
-12992 -12993  12994 -153 -12996 0
-12992 -12993  12994 -153  12997 0

c  -1+1 --> 0
c    ( b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0 ∧  p_153) -> (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧ -b^{17, 10}_0)
c  in CNF:
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_2
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_1
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_0
c  in DIMACS:
-12992  12993 -12994 -153 -12995 0
-12992  12993 -12994 -153 -12996 0
-12992  12993 -12994 -153 -12997 0

c  0+1 --> 1
c    (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧  p_153) -> (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0)
c  in CNF:
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_2
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_1
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨  b^{17, 10}_0
c  in DIMACS:
 12992  12993  12994 -153 -12995 0
 12992  12993  12994 -153 -12996 0
 12992  12993  12994 -153  12997 0

c  1+1 --> 2
c    (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0 ∧  p_153) -> (-b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0)
c  in CNF:
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_2
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨  b^{17, 10}_1
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ -p_153 ∨ -b^{17, 10}_0
c  in DIMACS:
 12992  12993 -12994 -153 -12995 0
 12992  12993 -12994 -153  12996 0
 12992  12993 -12994 -153 -12997 0

c  2+1 --> break 
c    (-b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧  p_153) -> break
c  in CNF:
c     b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 12992 -12993  12994 -153 1162 0


c  2-1 --> 1
c    (-b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧ -p_153) -> (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0)
c  in CNF:
c     b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_2
c     b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_1
c     b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨  b^{17, 10}_0
c  in DIMACS:
 12992 -12993  12994  153 -12995 0
 12992 -12993  12994  153 -12996 0
 12992 -12993  12994  153  12997 0

c  1-1 --> 0
c    (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0 ∧ -p_153) -> (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧ -b^{17, 10}_0)
c  in CNF:
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_2
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_1
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_0
c  in DIMACS:
 12992  12993 -12994  153 -12995 0
 12992  12993 -12994  153 -12996 0
 12992  12993 -12994  153 -12997 0

c  0-1 --> -1
c    (-b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧ -p_153) -> ( b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0)
c  in CNF:
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨  b^{17, 10}_2
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_1
c     b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨  b^{17, 10}_0
c  in DIMACS:
 12992  12993  12994  153  12995 0
 12992  12993  12994  153 -12996 0
 12992  12993  12994  153  12997 0

c  -1-1 --> -2
c    ( b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧  b^{17, 9}_0 ∧ -p_153) -> ( b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0)
c  in CNF:
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨  b^{17, 10}_2
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨  b^{17, 10}_1
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨  p_153 ∨ -b^{17, 10}_0
c  in DIMACS:
-12992  12993 -12994  153  12995 0
-12992  12993 -12994  153  12996 0
-12992  12993 -12994  153 -12997 0

c  -2-1 --> break 
c    ( b^{17, 9}_2 ∧  b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨  b^{17, 9}_0 ∨  p_153 ∨ break
c  in DIMACS:
-12992 -12993  12994  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 9}_2 ∧ -b^{17, 9}_1 ∧ -b^{17, 9}_0 ∧ true) 
c  in CNF:
c    -b^{17, 9}_2 ∨  b^{17, 9}_1 ∨  b^{17, 9}_0 ∨ false 
c  in DIMACS:
-12992  12993  12994  0

c  3 does not represent an automaton state.
c    -(-b^{17, 9}_2 ∧  b^{17, 9}_1 ∧  b^{17, 9}_0 ∧ true) 
c  in CNF:
c     b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ false 
c  in DIMACS:
 12992 -12993 -12994  0
c  -3 does not represent an automaton state.
c    -( b^{17, 9}_2 ∧  b^{17, 9}_1 ∧  b^{17, 9}_0 ∧ true) 
c  in CNF:
c    -b^{17, 9}_2 ∨ -b^{17, 9}_1 ∨ -b^{17, 9}_0 ∨ false 
c  in DIMACS:
-12992 -12993 -12994  0

c i = 10
c  -2+1 --> -1
c    ( b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧  p_170) -> ( b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0)
c  in CNF:
c    -b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨  b^{17, 11}_2
c    -b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_1
c    -b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨  b^{17, 11}_0
c  in DIMACS:
-12995 -12996  12997 -170  12998 0
-12995 -12996  12997 -170 -12999 0
-12995 -12996  12997 -170  13000 0

c  -1+1 --> 0
c    ( b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0 ∧  p_170) -> (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧ -b^{17, 11}_0)
c  in CNF:
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_2
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_1
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_0
c  in DIMACS:
-12995  12996 -12997 -170 -12998 0
-12995  12996 -12997 -170 -12999 0
-12995  12996 -12997 -170 -13000 0

c  0+1 --> 1
c    (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧  p_170) -> (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0)
c  in CNF:
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_2
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_1
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨  b^{17, 11}_0
c  in DIMACS:
 12995  12996  12997 -170 -12998 0
 12995  12996  12997 -170 -12999 0
 12995  12996  12997 -170  13000 0

c  1+1 --> 2
c    (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0 ∧  p_170) -> (-b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0)
c  in CNF:
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_2
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨  b^{17, 11}_1
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ -p_170 ∨ -b^{17, 11}_0
c  in DIMACS:
 12995  12996 -12997 -170 -12998 0
 12995  12996 -12997 -170  12999 0
 12995  12996 -12997 -170 -13000 0

c  2+1 --> break 
c    (-b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧  p_170) -> break
c  in CNF:
c     b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 12995 -12996  12997 -170 1162 0


c  2-1 --> 1
c    (-b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧ -p_170) -> (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0)
c  in CNF:
c     b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_2
c     b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_1
c     b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨  b^{17, 11}_0
c  in DIMACS:
 12995 -12996  12997  170 -12998 0
 12995 -12996  12997  170 -12999 0
 12995 -12996  12997  170  13000 0

c  1-1 --> 0
c    (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0 ∧ -p_170) -> (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧ -b^{17, 11}_0)
c  in CNF:
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_2
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_1
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_0
c  in DIMACS:
 12995  12996 -12997  170 -12998 0
 12995  12996 -12997  170 -12999 0
 12995  12996 -12997  170 -13000 0

c  0-1 --> -1
c    (-b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧ -p_170) -> ( b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0)
c  in CNF:
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨  b^{17, 11}_2
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_1
c     b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨  b^{17, 11}_0
c  in DIMACS:
 12995  12996  12997  170  12998 0
 12995  12996  12997  170 -12999 0
 12995  12996  12997  170  13000 0

c  -1-1 --> -2
c    ( b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧  b^{17, 10}_0 ∧ -p_170) -> ( b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0)
c  in CNF:
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨  b^{17, 11}_2
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨  b^{17, 11}_1
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨  p_170 ∨ -b^{17, 11}_0
c  in DIMACS:
-12995  12996 -12997  170  12998 0
-12995  12996 -12997  170  12999 0
-12995  12996 -12997  170 -13000 0

c  -2-1 --> break 
c    ( b^{17, 10}_2 ∧  b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨  b^{17, 10}_0 ∨  p_170 ∨ break
c  in DIMACS:
-12995 -12996  12997  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 10}_2 ∧ -b^{17, 10}_1 ∧ -b^{17, 10}_0 ∧ true) 
c  in CNF:
c    -b^{17, 10}_2 ∨  b^{17, 10}_1 ∨  b^{17, 10}_0 ∨ false 
c  in DIMACS:
-12995  12996  12997  0

c  3 does not represent an automaton state.
c    -(-b^{17, 10}_2 ∧  b^{17, 10}_1 ∧  b^{17, 10}_0 ∧ true) 
c  in CNF:
c     b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ false 
c  in DIMACS:
 12995 -12996 -12997  0
c  -3 does not represent an automaton state.
c    -( b^{17, 10}_2 ∧  b^{17, 10}_1 ∧  b^{17, 10}_0 ∧ true) 
c  in CNF:
c    -b^{17, 10}_2 ∨ -b^{17, 10}_1 ∨ -b^{17, 10}_0 ∨ false 
c  in DIMACS:
-12995 -12996 -12997  0

c i = 11
c  -2+1 --> -1
c    ( b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧  p_187) -> ( b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0)
c  in CNF:
c    -b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨  b^{17, 12}_2
c    -b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_1
c    -b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨  b^{17, 12}_0
c  in DIMACS:
-12998 -12999  13000 -187  13001 0
-12998 -12999  13000 -187 -13002 0
-12998 -12999  13000 -187  13003 0

c  -1+1 --> 0
c    ( b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0 ∧  p_187) -> (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧ -b^{17, 12}_0)
c  in CNF:
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_2
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_1
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_0
c  in DIMACS:
-12998  12999 -13000 -187 -13001 0
-12998  12999 -13000 -187 -13002 0
-12998  12999 -13000 -187 -13003 0

c  0+1 --> 1
c    (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧  p_187) -> (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0)
c  in CNF:
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_2
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_1
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨  b^{17, 12}_0
c  in DIMACS:
 12998  12999  13000 -187 -13001 0
 12998  12999  13000 -187 -13002 0
 12998  12999  13000 -187  13003 0

c  1+1 --> 2
c    (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0 ∧  p_187) -> (-b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0)
c  in CNF:
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_2
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨  b^{17, 12}_1
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ -p_187 ∨ -b^{17, 12}_0
c  in DIMACS:
 12998  12999 -13000 -187 -13001 0
 12998  12999 -13000 -187  13002 0
 12998  12999 -13000 -187 -13003 0

c  2+1 --> break 
c    (-b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧  p_187) -> break
c  in CNF:
c     b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ -p_187 ∨ break
c  in DIMACS:
 12998 -12999  13000 -187 1162 0


c  2-1 --> 1
c    (-b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧ -p_187) -> (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0)
c  in CNF:
c     b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_2
c     b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_1
c     b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨  b^{17, 12}_0
c  in DIMACS:
 12998 -12999  13000  187 -13001 0
 12998 -12999  13000  187 -13002 0
 12998 -12999  13000  187  13003 0

c  1-1 --> 0
c    (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0 ∧ -p_187) -> (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧ -b^{17, 12}_0)
c  in CNF:
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_2
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_1
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_0
c  in DIMACS:
 12998  12999 -13000  187 -13001 0
 12998  12999 -13000  187 -13002 0
 12998  12999 -13000  187 -13003 0

c  0-1 --> -1
c    (-b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧ -p_187) -> ( b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0)
c  in CNF:
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨  b^{17, 12}_2
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_1
c     b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨  b^{17, 12}_0
c  in DIMACS:
 12998  12999  13000  187  13001 0
 12998  12999  13000  187 -13002 0
 12998  12999  13000  187  13003 0

c  -1-1 --> -2
c    ( b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧  b^{17, 11}_0 ∧ -p_187) -> ( b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0)
c  in CNF:
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨  b^{17, 12}_2
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨  b^{17, 12}_1
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨  p_187 ∨ -b^{17, 12}_0
c  in DIMACS:
-12998  12999 -13000  187  13001 0
-12998  12999 -13000  187  13002 0
-12998  12999 -13000  187 -13003 0

c  -2-1 --> break 
c    ( b^{17, 11}_2 ∧  b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧ -p_187) -> break
c  in CNF:
c    -b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨  b^{17, 11}_0 ∨  p_187 ∨ break
c  in DIMACS:
-12998 -12999  13000  187 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 11}_2 ∧ -b^{17, 11}_1 ∧ -b^{17, 11}_0 ∧ true) 
c  in CNF:
c    -b^{17, 11}_2 ∨  b^{17, 11}_1 ∨  b^{17, 11}_0 ∨ false 
c  in DIMACS:
-12998  12999  13000  0

c  3 does not represent an automaton state.
c    -(-b^{17, 11}_2 ∧  b^{17, 11}_1 ∧  b^{17, 11}_0 ∧ true) 
c  in CNF:
c     b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ false 
c  in DIMACS:
 12998 -12999 -13000  0
c  -3 does not represent an automaton state.
c    -( b^{17, 11}_2 ∧  b^{17, 11}_1 ∧  b^{17, 11}_0 ∧ true) 
c  in CNF:
c    -b^{17, 11}_2 ∨ -b^{17, 11}_1 ∨ -b^{17, 11}_0 ∨ false 
c  in DIMACS:
-12998 -12999 -13000  0

c i = 12
c  -2+1 --> -1
c    ( b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧  p_204) -> ( b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0)
c  in CNF:
c    -b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨  b^{17, 13}_2
c    -b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_1
c    -b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨  b^{17, 13}_0
c  in DIMACS:
-13001 -13002  13003 -204  13004 0
-13001 -13002  13003 -204 -13005 0
-13001 -13002  13003 -204  13006 0

c  -1+1 --> 0
c    ( b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0 ∧  p_204) -> (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧ -b^{17, 13}_0)
c  in CNF:
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_2
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_1
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_0
c  in DIMACS:
-13001  13002 -13003 -204 -13004 0
-13001  13002 -13003 -204 -13005 0
-13001  13002 -13003 -204 -13006 0

c  0+1 --> 1
c    (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧  p_204) -> (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0)
c  in CNF:
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_2
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_1
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨  b^{17, 13}_0
c  in DIMACS:
 13001  13002  13003 -204 -13004 0
 13001  13002  13003 -204 -13005 0
 13001  13002  13003 -204  13006 0

c  1+1 --> 2
c    (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0 ∧  p_204) -> (-b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0)
c  in CNF:
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_2
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨  b^{17, 13}_1
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ -p_204 ∨ -b^{17, 13}_0
c  in DIMACS:
 13001  13002 -13003 -204 -13004 0
 13001  13002 -13003 -204  13005 0
 13001  13002 -13003 -204 -13006 0

c  2+1 --> break 
c    (-b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧  p_204) -> break
c  in CNF:
c     b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 13001 -13002  13003 -204 1162 0


c  2-1 --> 1
c    (-b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧ -p_204) -> (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0)
c  in CNF:
c     b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_2
c     b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_1
c     b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨  b^{17, 13}_0
c  in DIMACS:
 13001 -13002  13003  204 -13004 0
 13001 -13002  13003  204 -13005 0
 13001 -13002  13003  204  13006 0

c  1-1 --> 0
c    (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0 ∧ -p_204) -> (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧ -b^{17, 13}_0)
c  in CNF:
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_2
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_1
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_0
c  in DIMACS:
 13001  13002 -13003  204 -13004 0
 13001  13002 -13003  204 -13005 0
 13001  13002 -13003  204 -13006 0

c  0-1 --> -1
c    (-b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧ -p_204) -> ( b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0)
c  in CNF:
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨  b^{17, 13}_2
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_1
c     b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨  b^{17, 13}_0
c  in DIMACS:
 13001  13002  13003  204  13004 0
 13001  13002  13003  204 -13005 0
 13001  13002  13003  204  13006 0

c  -1-1 --> -2
c    ( b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧  b^{17, 12}_0 ∧ -p_204) -> ( b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0)
c  in CNF:
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨  b^{17, 13}_2
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨  b^{17, 13}_1
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨  p_204 ∨ -b^{17, 13}_0
c  in DIMACS:
-13001  13002 -13003  204  13004 0
-13001  13002 -13003  204  13005 0
-13001  13002 -13003  204 -13006 0

c  -2-1 --> break 
c    ( b^{17, 12}_2 ∧  b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨  b^{17, 12}_0 ∨  p_204 ∨ break
c  in DIMACS:
-13001 -13002  13003  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 12}_2 ∧ -b^{17, 12}_1 ∧ -b^{17, 12}_0 ∧ true) 
c  in CNF:
c    -b^{17, 12}_2 ∨  b^{17, 12}_1 ∨  b^{17, 12}_0 ∨ false 
c  in DIMACS:
-13001  13002  13003  0

c  3 does not represent an automaton state.
c    -(-b^{17, 12}_2 ∧  b^{17, 12}_1 ∧  b^{17, 12}_0 ∧ true) 
c  in CNF:
c     b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ false 
c  in DIMACS:
 13001 -13002 -13003  0
c  -3 does not represent an automaton state.
c    -( b^{17, 12}_2 ∧  b^{17, 12}_1 ∧  b^{17, 12}_0 ∧ true) 
c  in CNF:
c    -b^{17, 12}_2 ∨ -b^{17, 12}_1 ∨ -b^{17, 12}_0 ∨ false 
c  in DIMACS:
-13001 -13002 -13003  0

c i = 13
c  -2+1 --> -1
c    ( b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧  p_221) -> ( b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0)
c  in CNF:
c    -b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨  b^{17, 14}_2
c    -b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_1
c    -b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨  b^{17, 14}_0
c  in DIMACS:
-13004 -13005  13006 -221  13007 0
-13004 -13005  13006 -221 -13008 0
-13004 -13005  13006 -221  13009 0

c  -1+1 --> 0
c    ( b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0 ∧  p_221) -> (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧ -b^{17, 14}_0)
c  in CNF:
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_2
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_1
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_0
c  in DIMACS:
-13004  13005 -13006 -221 -13007 0
-13004  13005 -13006 -221 -13008 0
-13004  13005 -13006 -221 -13009 0

c  0+1 --> 1
c    (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧  p_221) -> (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0)
c  in CNF:
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_2
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_1
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨  b^{17, 14}_0
c  in DIMACS:
 13004  13005  13006 -221 -13007 0
 13004  13005  13006 -221 -13008 0
 13004  13005  13006 -221  13009 0

c  1+1 --> 2
c    (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0 ∧  p_221) -> (-b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0)
c  in CNF:
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_2
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨  b^{17, 14}_1
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ -p_221 ∨ -b^{17, 14}_0
c  in DIMACS:
 13004  13005 -13006 -221 -13007 0
 13004  13005 -13006 -221  13008 0
 13004  13005 -13006 -221 -13009 0

c  2+1 --> break 
c    (-b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧  p_221) -> break
c  in CNF:
c     b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ -p_221 ∨ break
c  in DIMACS:
 13004 -13005  13006 -221 1162 0


c  2-1 --> 1
c    (-b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧ -p_221) -> (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0)
c  in CNF:
c     b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_2
c     b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_1
c     b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨  b^{17, 14}_0
c  in DIMACS:
 13004 -13005  13006  221 -13007 0
 13004 -13005  13006  221 -13008 0
 13004 -13005  13006  221  13009 0

c  1-1 --> 0
c    (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0 ∧ -p_221) -> (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧ -b^{17, 14}_0)
c  in CNF:
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_2
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_1
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_0
c  in DIMACS:
 13004  13005 -13006  221 -13007 0
 13004  13005 -13006  221 -13008 0
 13004  13005 -13006  221 -13009 0

c  0-1 --> -1
c    (-b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧ -p_221) -> ( b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0)
c  in CNF:
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨  b^{17, 14}_2
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_1
c     b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨  b^{17, 14}_0
c  in DIMACS:
 13004  13005  13006  221  13007 0
 13004  13005  13006  221 -13008 0
 13004  13005  13006  221  13009 0

c  -1-1 --> -2
c    ( b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧  b^{17, 13}_0 ∧ -p_221) -> ( b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0)
c  in CNF:
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨  b^{17, 14}_2
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨  b^{17, 14}_1
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨  p_221 ∨ -b^{17, 14}_0
c  in DIMACS:
-13004  13005 -13006  221  13007 0
-13004  13005 -13006  221  13008 0
-13004  13005 -13006  221 -13009 0

c  -2-1 --> break 
c    ( b^{17, 13}_2 ∧  b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧ -p_221) -> break
c  in CNF:
c    -b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨  b^{17, 13}_0 ∨  p_221 ∨ break
c  in DIMACS:
-13004 -13005  13006  221 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 13}_2 ∧ -b^{17, 13}_1 ∧ -b^{17, 13}_0 ∧ true) 
c  in CNF:
c    -b^{17, 13}_2 ∨  b^{17, 13}_1 ∨  b^{17, 13}_0 ∨ false 
c  in DIMACS:
-13004  13005  13006  0

c  3 does not represent an automaton state.
c    -(-b^{17, 13}_2 ∧  b^{17, 13}_1 ∧  b^{17, 13}_0 ∧ true) 
c  in CNF:
c     b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ false 
c  in DIMACS:
 13004 -13005 -13006  0
c  -3 does not represent an automaton state.
c    -( b^{17, 13}_2 ∧  b^{17, 13}_1 ∧  b^{17, 13}_0 ∧ true) 
c  in CNF:
c    -b^{17, 13}_2 ∨ -b^{17, 13}_1 ∨ -b^{17, 13}_0 ∨ false 
c  in DIMACS:
-13004 -13005 -13006  0

c i = 14
c  -2+1 --> -1
c    ( b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧  p_238) -> ( b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0)
c  in CNF:
c    -b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨  b^{17, 15}_2
c    -b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_1
c    -b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨  b^{17, 15}_0
c  in DIMACS:
-13007 -13008  13009 -238  13010 0
-13007 -13008  13009 -238 -13011 0
-13007 -13008  13009 -238  13012 0

c  -1+1 --> 0
c    ( b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0 ∧  p_238) -> (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧ -b^{17, 15}_0)
c  in CNF:
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_2
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_1
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_0
c  in DIMACS:
-13007  13008 -13009 -238 -13010 0
-13007  13008 -13009 -238 -13011 0
-13007  13008 -13009 -238 -13012 0

c  0+1 --> 1
c    (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧  p_238) -> (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0)
c  in CNF:
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_2
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_1
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨  b^{17, 15}_0
c  in DIMACS:
 13007  13008  13009 -238 -13010 0
 13007  13008  13009 -238 -13011 0
 13007  13008  13009 -238  13012 0

c  1+1 --> 2
c    (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0 ∧  p_238) -> (-b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0)
c  in CNF:
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_2
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨  b^{17, 15}_1
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ -p_238 ∨ -b^{17, 15}_0
c  in DIMACS:
 13007  13008 -13009 -238 -13010 0
 13007  13008 -13009 -238  13011 0
 13007  13008 -13009 -238 -13012 0

c  2+1 --> break 
c    (-b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧  p_238) -> break
c  in CNF:
c     b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 13007 -13008  13009 -238 1162 0


c  2-1 --> 1
c    (-b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧ -p_238) -> (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0)
c  in CNF:
c     b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_2
c     b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_1
c     b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨  b^{17, 15}_0
c  in DIMACS:
 13007 -13008  13009  238 -13010 0
 13007 -13008  13009  238 -13011 0
 13007 -13008  13009  238  13012 0

c  1-1 --> 0
c    (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0 ∧ -p_238) -> (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧ -b^{17, 15}_0)
c  in CNF:
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_2
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_1
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_0
c  in DIMACS:
 13007  13008 -13009  238 -13010 0
 13007  13008 -13009  238 -13011 0
 13007  13008 -13009  238 -13012 0

c  0-1 --> -1
c    (-b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧ -p_238) -> ( b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0)
c  in CNF:
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨  b^{17, 15}_2
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_1
c     b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨  b^{17, 15}_0
c  in DIMACS:
 13007  13008  13009  238  13010 0
 13007  13008  13009  238 -13011 0
 13007  13008  13009  238  13012 0

c  -1-1 --> -2
c    ( b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧  b^{17, 14}_0 ∧ -p_238) -> ( b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0)
c  in CNF:
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨  b^{17, 15}_2
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨  b^{17, 15}_1
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨  p_238 ∨ -b^{17, 15}_0
c  in DIMACS:
-13007  13008 -13009  238  13010 0
-13007  13008 -13009  238  13011 0
-13007  13008 -13009  238 -13012 0

c  -2-1 --> break 
c    ( b^{17, 14}_2 ∧  b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨  b^{17, 14}_0 ∨  p_238 ∨ break
c  in DIMACS:
-13007 -13008  13009  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 14}_2 ∧ -b^{17, 14}_1 ∧ -b^{17, 14}_0 ∧ true) 
c  in CNF:
c    -b^{17, 14}_2 ∨  b^{17, 14}_1 ∨  b^{17, 14}_0 ∨ false 
c  in DIMACS:
-13007  13008  13009  0

c  3 does not represent an automaton state.
c    -(-b^{17, 14}_2 ∧  b^{17, 14}_1 ∧  b^{17, 14}_0 ∧ true) 
c  in CNF:
c     b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ false 
c  in DIMACS:
 13007 -13008 -13009  0
c  -3 does not represent an automaton state.
c    -( b^{17, 14}_2 ∧  b^{17, 14}_1 ∧  b^{17, 14}_0 ∧ true) 
c  in CNF:
c    -b^{17, 14}_2 ∨ -b^{17, 14}_1 ∨ -b^{17, 14}_0 ∨ false 
c  in DIMACS:
-13007 -13008 -13009  0

c i = 15
c  -2+1 --> -1
c    ( b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧  p_255) -> ( b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0)
c  in CNF:
c    -b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨  b^{17, 16}_2
c    -b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_1
c    -b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨  b^{17, 16}_0
c  in DIMACS:
-13010 -13011  13012 -255  13013 0
-13010 -13011  13012 -255 -13014 0
-13010 -13011  13012 -255  13015 0

c  -1+1 --> 0
c    ( b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0 ∧  p_255) -> (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧ -b^{17, 16}_0)
c  in CNF:
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_2
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_1
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_0
c  in DIMACS:
-13010  13011 -13012 -255 -13013 0
-13010  13011 -13012 -255 -13014 0
-13010  13011 -13012 -255 -13015 0

c  0+1 --> 1
c    (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧  p_255) -> (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0)
c  in CNF:
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_2
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_1
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨  b^{17, 16}_0
c  in DIMACS:
 13010  13011  13012 -255 -13013 0
 13010  13011  13012 -255 -13014 0
 13010  13011  13012 -255  13015 0

c  1+1 --> 2
c    (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0 ∧  p_255) -> (-b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0)
c  in CNF:
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_2
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨  b^{17, 16}_1
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ -p_255 ∨ -b^{17, 16}_0
c  in DIMACS:
 13010  13011 -13012 -255 -13013 0
 13010  13011 -13012 -255  13014 0
 13010  13011 -13012 -255 -13015 0

c  2+1 --> break 
c    (-b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧  p_255) -> break
c  in CNF:
c     b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 13010 -13011  13012 -255 1162 0


c  2-1 --> 1
c    (-b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧ -p_255) -> (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0)
c  in CNF:
c     b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_2
c     b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_1
c     b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨  b^{17, 16}_0
c  in DIMACS:
 13010 -13011  13012  255 -13013 0
 13010 -13011  13012  255 -13014 0
 13010 -13011  13012  255  13015 0

c  1-1 --> 0
c    (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0 ∧ -p_255) -> (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧ -b^{17, 16}_0)
c  in CNF:
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_2
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_1
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_0
c  in DIMACS:
 13010  13011 -13012  255 -13013 0
 13010  13011 -13012  255 -13014 0
 13010  13011 -13012  255 -13015 0

c  0-1 --> -1
c    (-b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧ -p_255) -> ( b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0)
c  in CNF:
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨  b^{17, 16}_2
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_1
c     b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨  b^{17, 16}_0
c  in DIMACS:
 13010  13011  13012  255  13013 0
 13010  13011  13012  255 -13014 0
 13010  13011  13012  255  13015 0

c  -1-1 --> -2
c    ( b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧  b^{17, 15}_0 ∧ -p_255) -> ( b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0)
c  in CNF:
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨  b^{17, 16}_2
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨  b^{17, 16}_1
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨  p_255 ∨ -b^{17, 16}_0
c  in DIMACS:
-13010  13011 -13012  255  13013 0
-13010  13011 -13012  255  13014 0
-13010  13011 -13012  255 -13015 0

c  -2-1 --> break 
c    ( b^{17, 15}_2 ∧  b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨  b^{17, 15}_0 ∨  p_255 ∨ break
c  in DIMACS:
-13010 -13011  13012  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 15}_2 ∧ -b^{17, 15}_1 ∧ -b^{17, 15}_0 ∧ true) 
c  in CNF:
c    -b^{17, 15}_2 ∨  b^{17, 15}_1 ∨  b^{17, 15}_0 ∨ false 
c  in DIMACS:
-13010  13011  13012  0

c  3 does not represent an automaton state.
c    -(-b^{17, 15}_2 ∧  b^{17, 15}_1 ∧  b^{17, 15}_0 ∧ true) 
c  in CNF:
c     b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ false 
c  in DIMACS:
 13010 -13011 -13012  0
c  -3 does not represent an automaton state.
c    -( b^{17, 15}_2 ∧  b^{17, 15}_1 ∧  b^{17, 15}_0 ∧ true) 
c  in CNF:
c    -b^{17, 15}_2 ∨ -b^{17, 15}_1 ∨ -b^{17, 15}_0 ∨ false 
c  in DIMACS:
-13010 -13011 -13012  0

c i = 16
c  -2+1 --> -1
c    ( b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧  p_272) -> ( b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0)
c  in CNF:
c    -b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨  b^{17, 17}_2
c    -b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_1
c    -b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨  b^{17, 17}_0
c  in DIMACS:
-13013 -13014  13015 -272  13016 0
-13013 -13014  13015 -272 -13017 0
-13013 -13014  13015 -272  13018 0

c  -1+1 --> 0
c    ( b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0 ∧  p_272) -> (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧ -b^{17, 17}_0)
c  in CNF:
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_2
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_1
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_0
c  in DIMACS:
-13013  13014 -13015 -272 -13016 0
-13013  13014 -13015 -272 -13017 0
-13013  13014 -13015 -272 -13018 0

c  0+1 --> 1
c    (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧  p_272) -> (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0)
c  in CNF:
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_2
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_1
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨  b^{17, 17}_0
c  in DIMACS:
 13013  13014  13015 -272 -13016 0
 13013  13014  13015 -272 -13017 0
 13013  13014  13015 -272  13018 0

c  1+1 --> 2
c    (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0 ∧  p_272) -> (-b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0)
c  in CNF:
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_2
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨  b^{17, 17}_1
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ -p_272 ∨ -b^{17, 17}_0
c  in DIMACS:
 13013  13014 -13015 -272 -13016 0
 13013  13014 -13015 -272  13017 0
 13013  13014 -13015 -272 -13018 0

c  2+1 --> break 
c    (-b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧  p_272) -> break
c  in CNF:
c     b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 13013 -13014  13015 -272 1162 0


c  2-1 --> 1
c    (-b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧ -p_272) -> (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0)
c  in CNF:
c     b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_2
c     b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_1
c     b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨  b^{17, 17}_0
c  in DIMACS:
 13013 -13014  13015  272 -13016 0
 13013 -13014  13015  272 -13017 0
 13013 -13014  13015  272  13018 0

c  1-1 --> 0
c    (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0 ∧ -p_272) -> (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧ -b^{17, 17}_0)
c  in CNF:
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_2
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_1
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_0
c  in DIMACS:
 13013  13014 -13015  272 -13016 0
 13013  13014 -13015  272 -13017 0
 13013  13014 -13015  272 -13018 0

c  0-1 --> -1
c    (-b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧ -p_272) -> ( b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0)
c  in CNF:
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨  b^{17, 17}_2
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_1
c     b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨  b^{17, 17}_0
c  in DIMACS:
 13013  13014  13015  272  13016 0
 13013  13014  13015  272 -13017 0
 13013  13014  13015  272  13018 0

c  -1-1 --> -2
c    ( b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧  b^{17, 16}_0 ∧ -p_272) -> ( b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0)
c  in CNF:
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨  b^{17, 17}_2
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨  b^{17, 17}_1
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨  p_272 ∨ -b^{17, 17}_0
c  in DIMACS:
-13013  13014 -13015  272  13016 0
-13013  13014 -13015  272  13017 0
-13013  13014 -13015  272 -13018 0

c  -2-1 --> break 
c    ( b^{17, 16}_2 ∧  b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨  b^{17, 16}_0 ∨  p_272 ∨ break
c  in DIMACS:
-13013 -13014  13015  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 16}_2 ∧ -b^{17, 16}_1 ∧ -b^{17, 16}_0 ∧ true) 
c  in CNF:
c    -b^{17, 16}_2 ∨  b^{17, 16}_1 ∨  b^{17, 16}_0 ∨ false 
c  in DIMACS:
-13013  13014  13015  0

c  3 does not represent an automaton state.
c    -(-b^{17, 16}_2 ∧  b^{17, 16}_1 ∧  b^{17, 16}_0 ∧ true) 
c  in CNF:
c     b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ false 
c  in DIMACS:
 13013 -13014 -13015  0
c  -3 does not represent an automaton state.
c    -( b^{17, 16}_2 ∧  b^{17, 16}_1 ∧  b^{17, 16}_0 ∧ true) 
c  in CNF:
c    -b^{17, 16}_2 ∨ -b^{17, 16}_1 ∨ -b^{17, 16}_0 ∨ false 
c  in DIMACS:
-13013 -13014 -13015  0

c i = 17
c  -2+1 --> -1
c    ( b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧  p_289) -> ( b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0)
c  in CNF:
c    -b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨  b^{17, 18}_2
c    -b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_1
c    -b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨  b^{17, 18}_0
c  in DIMACS:
-13016 -13017  13018 -289  13019 0
-13016 -13017  13018 -289 -13020 0
-13016 -13017  13018 -289  13021 0

c  -1+1 --> 0
c    ( b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0 ∧  p_289) -> (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧ -b^{17, 18}_0)
c  in CNF:
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_2
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_1
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_0
c  in DIMACS:
-13016  13017 -13018 -289 -13019 0
-13016  13017 -13018 -289 -13020 0
-13016  13017 -13018 -289 -13021 0

c  0+1 --> 1
c    (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧  p_289) -> (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0)
c  in CNF:
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_2
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_1
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨  b^{17, 18}_0
c  in DIMACS:
 13016  13017  13018 -289 -13019 0
 13016  13017  13018 -289 -13020 0
 13016  13017  13018 -289  13021 0

c  1+1 --> 2
c    (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0 ∧  p_289) -> (-b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0)
c  in CNF:
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_2
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨  b^{17, 18}_1
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ -p_289 ∨ -b^{17, 18}_0
c  in DIMACS:
 13016  13017 -13018 -289 -13019 0
 13016  13017 -13018 -289  13020 0
 13016  13017 -13018 -289 -13021 0

c  2+1 --> break 
c    (-b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧  p_289) -> break
c  in CNF:
c     b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ -p_289 ∨ break
c  in DIMACS:
 13016 -13017  13018 -289 1162 0


c  2-1 --> 1
c    (-b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧ -p_289) -> (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0)
c  in CNF:
c     b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_2
c     b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_1
c     b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨  b^{17, 18}_0
c  in DIMACS:
 13016 -13017  13018  289 -13019 0
 13016 -13017  13018  289 -13020 0
 13016 -13017  13018  289  13021 0

c  1-1 --> 0
c    (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0 ∧ -p_289) -> (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧ -b^{17, 18}_0)
c  in CNF:
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_2
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_1
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_0
c  in DIMACS:
 13016  13017 -13018  289 -13019 0
 13016  13017 -13018  289 -13020 0
 13016  13017 -13018  289 -13021 0

c  0-1 --> -1
c    (-b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧ -p_289) -> ( b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0)
c  in CNF:
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨  b^{17, 18}_2
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_1
c     b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨  b^{17, 18}_0
c  in DIMACS:
 13016  13017  13018  289  13019 0
 13016  13017  13018  289 -13020 0
 13016  13017  13018  289  13021 0

c  -1-1 --> -2
c    ( b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧  b^{17, 17}_0 ∧ -p_289) -> ( b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0)
c  in CNF:
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨  b^{17, 18}_2
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨  b^{17, 18}_1
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨  p_289 ∨ -b^{17, 18}_0
c  in DIMACS:
-13016  13017 -13018  289  13019 0
-13016  13017 -13018  289  13020 0
-13016  13017 -13018  289 -13021 0

c  -2-1 --> break 
c    ( b^{17, 17}_2 ∧  b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧ -p_289) -> break
c  in CNF:
c    -b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨  b^{17, 17}_0 ∨  p_289 ∨ break
c  in DIMACS:
-13016 -13017  13018  289 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 17}_2 ∧ -b^{17, 17}_1 ∧ -b^{17, 17}_0 ∧ true) 
c  in CNF:
c    -b^{17, 17}_2 ∨  b^{17, 17}_1 ∨  b^{17, 17}_0 ∨ false 
c  in DIMACS:
-13016  13017  13018  0

c  3 does not represent an automaton state.
c    -(-b^{17, 17}_2 ∧  b^{17, 17}_1 ∧  b^{17, 17}_0 ∧ true) 
c  in CNF:
c     b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ false 
c  in DIMACS:
 13016 -13017 -13018  0
c  -3 does not represent an automaton state.
c    -( b^{17, 17}_2 ∧  b^{17, 17}_1 ∧  b^{17, 17}_0 ∧ true) 
c  in CNF:
c    -b^{17, 17}_2 ∨ -b^{17, 17}_1 ∨ -b^{17, 17}_0 ∨ false 
c  in DIMACS:
-13016 -13017 -13018  0

c i = 18
c  -2+1 --> -1
c    ( b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧  p_306) -> ( b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0)
c  in CNF:
c    -b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨  b^{17, 19}_2
c    -b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_1
c    -b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨  b^{17, 19}_0
c  in DIMACS:
-13019 -13020  13021 -306  13022 0
-13019 -13020  13021 -306 -13023 0
-13019 -13020  13021 -306  13024 0

c  -1+1 --> 0
c    ( b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0 ∧  p_306) -> (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧ -b^{17, 19}_0)
c  in CNF:
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_2
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_1
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_0
c  in DIMACS:
-13019  13020 -13021 -306 -13022 0
-13019  13020 -13021 -306 -13023 0
-13019  13020 -13021 -306 -13024 0

c  0+1 --> 1
c    (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧  p_306) -> (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0)
c  in CNF:
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_2
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_1
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨  b^{17, 19}_0
c  in DIMACS:
 13019  13020  13021 -306 -13022 0
 13019  13020  13021 -306 -13023 0
 13019  13020  13021 -306  13024 0

c  1+1 --> 2
c    (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0 ∧  p_306) -> (-b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0)
c  in CNF:
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_2
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨  b^{17, 19}_1
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ -p_306 ∨ -b^{17, 19}_0
c  in DIMACS:
 13019  13020 -13021 -306 -13022 0
 13019  13020 -13021 -306  13023 0
 13019  13020 -13021 -306 -13024 0

c  2+1 --> break 
c    (-b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧  p_306) -> break
c  in CNF:
c     b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 13019 -13020  13021 -306 1162 0


c  2-1 --> 1
c    (-b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧ -p_306) -> (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0)
c  in CNF:
c     b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_2
c     b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_1
c     b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨  b^{17, 19}_0
c  in DIMACS:
 13019 -13020  13021  306 -13022 0
 13019 -13020  13021  306 -13023 0
 13019 -13020  13021  306  13024 0

c  1-1 --> 0
c    (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0 ∧ -p_306) -> (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧ -b^{17, 19}_0)
c  in CNF:
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_2
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_1
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_0
c  in DIMACS:
 13019  13020 -13021  306 -13022 0
 13019  13020 -13021  306 -13023 0
 13019  13020 -13021  306 -13024 0

c  0-1 --> -1
c    (-b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧ -p_306) -> ( b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0)
c  in CNF:
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨  b^{17, 19}_2
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_1
c     b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨  b^{17, 19}_0
c  in DIMACS:
 13019  13020  13021  306  13022 0
 13019  13020  13021  306 -13023 0
 13019  13020  13021  306  13024 0

c  -1-1 --> -2
c    ( b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧  b^{17, 18}_0 ∧ -p_306) -> ( b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0)
c  in CNF:
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨  b^{17, 19}_2
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨  b^{17, 19}_1
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨  p_306 ∨ -b^{17, 19}_0
c  in DIMACS:
-13019  13020 -13021  306  13022 0
-13019  13020 -13021  306  13023 0
-13019  13020 -13021  306 -13024 0

c  -2-1 --> break 
c    ( b^{17, 18}_2 ∧  b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨  b^{17, 18}_0 ∨  p_306 ∨ break
c  in DIMACS:
-13019 -13020  13021  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 18}_2 ∧ -b^{17, 18}_1 ∧ -b^{17, 18}_0 ∧ true) 
c  in CNF:
c    -b^{17, 18}_2 ∨  b^{17, 18}_1 ∨  b^{17, 18}_0 ∨ false 
c  in DIMACS:
-13019  13020  13021  0

c  3 does not represent an automaton state.
c    -(-b^{17, 18}_2 ∧  b^{17, 18}_1 ∧  b^{17, 18}_0 ∧ true) 
c  in CNF:
c     b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ false 
c  in DIMACS:
 13019 -13020 -13021  0
c  -3 does not represent an automaton state.
c    -( b^{17, 18}_2 ∧  b^{17, 18}_1 ∧  b^{17, 18}_0 ∧ true) 
c  in CNF:
c    -b^{17, 18}_2 ∨ -b^{17, 18}_1 ∨ -b^{17, 18}_0 ∨ false 
c  in DIMACS:
-13019 -13020 -13021  0

c i = 19
c  -2+1 --> -1
c    ( b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧  p_323) -> ( b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0)
c  in CNF:
c    -b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨  b^{17, 20}_2
c    -b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_1
c    -b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨  b^{17, 20}_0
c  in DIMACS:
-13022 -13023  13024 -323  13025 0
-13022 -13023  13024 -323 -13026 0
-13022 -13023  13024 -323  13027 0

c  -1+1 --> 0
c    ( b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0 ∧  p_323) -> (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧ -b^{17, 20}_0)
c  in CNF:
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_2
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_1
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_0
c  in DIMACS:
-13022  13023 -13024 -323 -13025 0
-13022  13023 -13024 -323 -13026 0
-13022  13023 -13024 -323 -13027 0

c  0+1 --> 1
c    (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧  p_323) -> (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0)
c  in CNF:
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_2
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_1
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨  b^{17, 20}_0
c  in DIMACS:
 13022  13023  13024 -323 -13025 0
 13022  13023  13024 -323 -13026 0
 13022  13023  13024 -323  13027 0

c  1+1 --> 2
c    (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0 ∧  p_323) -> (-b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0)
c  in CNF:
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_2
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨  b^{17, 20}_1
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ -p_323 ∨ -b^{17, 20}_0
c  in DIMACS:
 13022  13023 -13024 -323 -13025 0
 13022  13023 -13024 -323  13026 0
 13022  13023 -13024 -323 -13027 0

c  2+1 --> break 
c    (-b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧  p_323) -> break
c  in CNF:
c     b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ -p_323 ∨ break
c  in DIMACS:
 13022 -13023  13024 -323 1162 0


c  2-1 --> 1
c    (-b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧ -p_323) -> (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0)
c  in CNF:
c     b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_2
c     b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_1
c     b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨  b^{17, 20}_0
c  in DIMACS:
 13022 -13023  13024  323 -13025 0
 13022 -13023  13024  323 -13026 0
 13022 -13023  13024  323  13027 0

c  1-1 --> 0
c    (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0 ∧ -p_323) -> (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧ -b^{17, 20}_0)
c  in CNF:
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_2
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_1
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_0
c  in DIMACS:
 13022  13023 -13024  323 -13025 0
 13022  13023 -13024  323 -13026 0
 13022  13023 -13024  323 -13027 0

c  0-1 --> -1
c    (-b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧ -p_323) -> ( b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0)
c  in CNF:
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨  b^{17, 20}_2
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_1
c     b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨  b^{17, 20}_0
c  in DIMACS:
 13022  13023  13024  323  13025 0
 13022  13023  13024  323 -13026 0
 13022  13023  13024  323  13027 0

c  -1-1 --> -2
c    ( b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧  b^{17, 19}_0 ∧ -p_323) -> ( b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0)
c  in CNF:
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨  b^{17, 20}_2
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨  b^{17, 20}_1
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨  p_323 ∨ -b^{17, 20}_0
c  in DIMACS:
-13022  13023 -13024  323  13025 0
-13022  13023 -13024  323  13026 0
-13022  13023 -13024  323 -13027 0

c  -2-1 --> break 
c    ( b^{17, 19}_2 ∧  b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧ -p_323) -> break
c  in CNF:
c    -b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨  b^{17, 19}_0 ∨  p_323 ∨ break
c  in DIMACS:
-13022 -13023  13024  323 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 19}_2 ∧ -b^{17, 19}_1 ∧ -b^{17, 19}_0 ∧ true) 
c  in CNF:
c    -b^{17, 19}_2 ∨  b^{17, 19}_1 ∨  b^{17, 19}_0 ∨ false 
c  in DIMACS:
-13022  13023  13024  0

c  3 does not represent an automaton state.
c    -(-b^{17, 19}_2 ∧  b^{17, 19}_1 ∧  b^{17, 19}_0 ∧ true) 
c  in CNF:
c     b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ false 
c  in DIMACS:
 13022 -13023 -13024  0
c  -3 does not represent an automaton state.
c    -( b^{17, 19}_2 ∧  b^{17, 19}_1 ∧  b^{17, 19}_0 ∧ true) 
c  in CNF:
c    -b^{17, 19}_2 ∨ -b^{17, 19}_1 ∨ -b^{17, 19}_0 ∨ false 
c  in DIMACS:
-13022 -13023 -13024  0

c i = 20
c  -2+1 --> -1
c    ( b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧  p_340) -> ( b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0)
c  in CNF:
c    -b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨  b^{17, 21}_2
c    -b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_1
c    -b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨  b^{17, 21}_0
c  in DIMACS:
-13025 -13026  13027 -340  13028 0
-13025 -13026  13027 -340 -13029 0
-13025 -13026  13027 -340  13030 0

c  -1+1 --> 0
c    ( b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0 ∧  p_340) -> (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧ -b^{17, 21}_0)
c  in CNF:
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_2
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_1
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_0
c  in DIMACS:
-13025  13026 -13027 -340 -13028 0
-13025  13026 -13027 -340 -13029 0
-13025  13026 -13027 -340 -13030 0

c  0+1 --> 1
c    (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧  p_340) -> (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0)
c  in CNF:
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_2
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_1
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨  b^{17, 21}_0
c  in DIMACS:
 13025  13026  13027 -340 -13028 0
 13025  13026  13027 -340 -13029 0
 13025  13026  13027 -340  13030 0

c  1+1 --> 2
c    (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0 ∧  p_340) -> (-b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0)
c  in CNF:
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_2
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨  b^{17, 21}_1
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ -p_340 ∨ -b^{17, 21}_0
c  in DIMACS:
 13025  13026 -13027 -340 -13028 0
 13025  13026 -13027 -340  13029 0
 13025  13026 -13027 -340 -13030 0

c  2+1 --> break 
c    (-b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧  p_340) -> break
c  in CNF:
c     b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 13025 -13026  13027 -340 1162 0


c  2-1 --> 1
c    (-b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧ -p_340) -> (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0)
c  in CNF:
c     b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_2
c     b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_1
c     b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨  b^{17, 21}_0
c  in DIMACS:
 13025 -13026  13027  340 -13028 0
 13025 -13026  13027  340 -13029 0
 13025 -13026  13027  340  13030 0

c  1-1 --> 0
c    (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0 ∧ -p_340) -> (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧ -b^{17, 21}_0)
c  in CNF:
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_2
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_1
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_0
c  in DIMACS:
 13025  13026 -13027  340 -13028 0
 13025  13026 -13027  340 -13029 0
 13025  13026 -13027  340 -13030 0

c  0-1 --> -1
c    (-b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧ -p_340) -> ( b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0)
c  in CNF:
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨  b^{17, 21}_2
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_1
c     b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨  b^{17, 21}_0
c  in DIMACS:
 13025  13026  13027  340  13028 0
 13025  13026  13027  340 -13029 0
 13025  13026  13027  340  13030 0

c  -1-1 --> -2
c    ( b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧  b^{17, 20}_0 ∧ -p_340) -> ( b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0)
c  in CNF:
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨  b^{17, 21}_2
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨  b^{17, 21}_1
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨  p_340 ∨ -b^{17, 21}_0
c  in DIMACS:
-13025  13026 -13027  340  13028 0
-13025  13026 -13027  340  13029 0
-13025  13026 -13027  340 -13030 0

c  -2-1 --> break 
c    ( b^{17, 20}_2 ∧  b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨  b^{17, 20}_0 ∨  p_340 ∨ break
c  in DIMACS:
-13025 -13026  13027  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 20}_2 ∧ -b^{17, 20}_1 ∧ -b^{17, 20}_0 ∧ true) 
c  in CNF:
c    -b^{17, 20}_2 ∨  b^{17, 20}_1 ∨  b^{17, 20}_0 ∨ false 
c  in DIMACS:
-13025  13026  13027  0

c  3 does not represent an automaton state.
c    -(-b^{17, 20}_2 ∧  b^{17, 20}_1 ∧  b^{17, 20}_0 ∧ true) 
c  in CNF:
c     b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ false 
c  in DIMACS:
 13025 -13026 -13027  0
c  -3 does not represent an automaton state.
c    -( b^{17, 20}_2 ∧  b^{17, 20}_1 ∧  b^{17, 20}_0 ∧ true) 
c  in CNF:
c    -b^{17, 20}_2 ∨ -b^{17, 20}_1 ∨ -b^{17, 20}_0 ∨ false 
c  in DIMACS:
-13025 -13026 -13027  0

c i = 21
c  -2+1 --> -1
c    ( b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧  p_357) -> ( b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0)
c  in CNF:
c    -b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨  b^{17, 22}_2
c    -b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_1
c    -b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨  b^{17, 22}_0
c  in DIMACS:
-13028 -13029  13030 -357  13031 0
-13028 -13029  13030 -357 -13032 0
-13028 -13029  13030 -357  13033 0

c  -1+1 --> 0
c    ( b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0 ∧  p_357) -> (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧ -b^{17, 22}_0)
c  in CNF:
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_2
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_1
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_0
c  in DIMACS:
-13028  13029 -13030 -357 -13031 0
-13028  13029 -13030 -357 -13032 0
-13028  13029 -13030 -357 -13033 0

c  0+1 --> 1
c    (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧  p_357) -> (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0)
c  in CNF:
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_2
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_1
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨  b^{17, 22}_0
c  in DIMACS:
 13028  13029  13030 -357 -13031 0
 13028  13029  13030 -357 -13032 0
 13028  13029  13030 -357  13033 0

c  1+1 --> 2
c    (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0 ∧  p_357) -> (-b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0)
c  in CNF:
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_2
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨  b^{17, 22}_1
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ -p_357 ∨ -b^{17, 22}_0
c  in DIMACS:
 13028  13029 -13030 -357 -13031 0
 13028  13029 -13030 -357  13032 0
 13028  13029 -13030 -357 -13033 0

c  2+1 --> break 
c    (-b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧  p_357) -> break
c  in CNF:
c     b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 13028 -13029  13030 -357 1162 0


c  2-1 --> 1
c    (-b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧ -p_357) -> (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0)
c  in CNF:
c     b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_2
c     b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_1
c     b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨  b^{17, 22}_0
c  in DIMACS:
 13028 -13029  13030  357 -13031 0
 13028 -13029  13030  357 -13032 0
 13028 -13029  13030  357  13033 0

c  1-1 --> 0
c    (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0 ∧ -p_357) -> (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧ -b^{17, 22}_0)
c  in CNF:
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_2
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_1
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_0
c  in DIMACS:
 13028  13029 -13030  357 -13031 0
 13028  13029 -13030  357 -13032 0
 13028  13029 -13030  357 -13033 0

c  0-1 --> -1
c    (-b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧ -p_357) -> ( b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0)
c  in CNF:
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨  b^{17, 22}_2
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_1
c     b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨  b^{17, 22}_0
c  in DIMACS:
 13028  13029  13030  357  13031 0
 13028  13029  13030  357 -13032 0
 13028  13029  13030  357  13033 0

c  -1-1 --> -2
c    ( b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧  b^{17, 21}_0 ∧ -p_357) -> ( b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0)
c  in CNF:
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨  b^{17, 22}_2
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨  b^{17, 22}_1
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨  p_357 ∨ -b^{17, 22}_0
c  in DIMACS:
-13028  13029 -13030  357  13031 0
-13028  13029 -13030  357  13032 0
-13028  13029 -13030  357 -13033 0

c  -2-1 --> break 
c    ( b^{17, 21}_2 ∧  b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨  b^{17, 21}_0 ∨  p_357 ∨ break
c  in DIMACS:
-13028 -13029  13030  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 21}_2 ∧ -b^{17, 21}_1 ∧ -b^{17, 21}_0 ∧ true) 
c  in CNF:
c    -b^{17, 21}_2 ∨  b^{17, 21}_1 ∨  b^{17, 21}_0 ∨ false 
c  in DIMACS:
-13028  13029  13030  0

c  3 does not represent an automaton state.
c    -(-b^{17, 21}_2 ∧  b^{17, 21}_1 ∧  b^{17, 21}_0 ∧ true) 
c  in CNF:
c     b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ false 
c  in DIMACS:
 13028 -13029 -13030  0
c  -3 does not represent an automaton state.
c    -( b^{17, 21}_2 ∧  b^{17, 21}_1 ∧  b^{17, 21}_0 ∧ true) 
c  in CNF:
c    -b^{17, 21}_2 ∨ -b^{17, 21}_1 ∨ -b^{17, 21}_0 ∨ false 
c  in DIMACS:
-13028 -13029 -13030  0

c i = 22
c  -2+1 --> -1
c    ( b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧  p_374) -> ( b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0)
c  in CNF:
c    -b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨  b^{17, 23}_2
c    -b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_1
c    -b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨  b^{17, 23}_0
c  in DIMACS:
-13031 -13032  13033 -374  13034 0
-13031 -13032  13033 -374 -13035 0
-13031 -13032  13033 -374  13036 0

c  -1+1 --> 0
c    ( b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0 ∧  p_374) -> (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧ -b^{17, 23}_0)
c  in CNF:
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_2
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_1
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_0
c  in DIMACS:
-13031  13032 -13033 -374 -13034 0
-13031  13032 -13033 -374 -13035 0
-13031  13032 -13033 -374 -13036 0

c  0+1 --> 1
c    (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧  p_374) -> (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0)
c  in CNF:
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_2
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_1
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨  b^{17, 23}_0
c  in DIMACS:
 13031  13032  13033 -374 -13034 0
 13031  13032  13033 -374 -13035 0
 13031  13032  13033 -374  13036 0

c  1+1 --> 2
c    (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0 ∧  p_374) -> (-b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0)
c  in CNF:
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_2
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨  b^{17, 23}_1
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ -p_374 ∨ -b^{17, 23}_0
c  in DIMACS:
 13031  13032 -13033 -374 -13034 0
 13031  13032 -13033 -374  13035 0
 13031  13032 -13033 -374 -13036 0

c  2+1 --> break 
c    (-b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧  p_374) -> break
c  in CNF:
c     b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 13031 -13032  13033 -374 1162 0


c  2-1 --> 1
c    (-b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧ -p_374) -> (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0)
c  in CNF:
c     b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_2
c     b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_1
c     b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨  b^{17, 23}_0
c  in DIMACS:
 13031 -13032  13033  374 -13034 0
 13031 -13032  13033  374 -13035 0
 13031 -13032  13033  374  13036 0

c  1-1 --> 0
c    (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0 ∧ -p_374) -> (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧ -b^{17, 23}_0)
c  in CNF:
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_2
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_1
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_0
c  in DIMACS:
 13031  13032 -13033  374 -13034 0
 13031  13032 -13033  374 -13035 0
 13031  13032 -13033  374 -13036 0

c  0-1 --> -1
c    (-b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧ -p_374) -> ( b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0)
c  in CNF:
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨  b^{17, 23}_2
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_1
c     b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨  b^{17, 23}_0
c  in DIMACS:
 13031  13032  13033  374  13034 0
 13031  13032  13033  374 -13035 0
 13031  13032  13033  374  13036 0

c  -1-1 --> -2
c    ( b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧  b^{17, 22}_0 ∧ -p_374) -> ( b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0)
c  in CNF:
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨  b^{17, 23}_2
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨  b^{17, 23}_1
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨  p_374 ∨ -b^{17, 23}_0
c  in DIMACS:
-13031  13032 -13033  374  13034 0
-13031  13032 -13033  374  13035 0
-13031  13032 -13033  374 -13036 0

c  -2-1 --> break 
c    ( b^{17, 22}_2 ∧  b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨  b^{17, 22}_0 ∨  p_374 ∨ break
c  in DIMACS:
-13031 -13032  13033  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 22}_2 ∧ -b^{17, 22}_1 ∧ -b^{17, 22}_0 ∧ true) 
c  in CNF:
c    -b^{17, 22}_2 ∨  b^{17, 22}_1 ∨  b^{17, 22}_0 ∨ false 
c  in DIMACS:
-13031  13032  13033  0

c  3 does not represent an automaton state.
c    -(-b^{17, 22}_2 ∧  b^{17, 22}_1 ∧  b^{17, 22}_0 ∧ true) 
c  in CNF:
c     b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ false 
c  in DIMACS:
 13031 -13032 -13033  0
c  -3 does not represent an automaton state.
c    -( b^{17, 22}_2 ∧  b^{17, 22}_1 ∧  b^{17, 22}_0 ∧ true) 
c  in CNF:
c    -b^{17, 22}_2 ∨ -b^{17, 22}_1 ∨ -b^{17, 22}_0 ∨ false 
c  in DIMACS:
-13031 -13032 -13033  0

c i = 23
c  -2+1 --> -1
c    ( b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧  p_391) -> ( b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0)
c  in CNF:
c    -b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨  b^{17, 24}_2
c    -b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_1
c    -b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨  b^{17, 24}_0
c  in DIMACS:
-13034 -13035  13036 -391  13037 0
-13034 -13035  13036 -391 -13038 0
-13034 -13035  13036 -391  13039 0

c  -1+1 --> 0
c    ( b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0 ∧  p_391) -> (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧ -b^{17, 24}_0)
c  in CNF:
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_2
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_1
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_0
c  in DIMACS:
-13034  13035 -13036 -391 -13037 0
-13034  13035 -13036 -391 -13038 0
-13034  13035 -13036 -391 -13039 0

c  0+1 --> 1
c    (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧  p_391) -> (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0)
c  in CNF:
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_2
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_1
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨  b^{17, 24}_0
c  in DIMACS:
 13034  13035  13036 -391 -13037 0
 13034  13035  13036 -391 -13038 0
 13034  13035  13036 -391  13039 0

c  1+1 --> 2
c    (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0 ∧  p_391) -> (-b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0)
c  in CNF:
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_2
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨  b^{17, 24}_1
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ -p_391 ∨ -b^{17, 24}_0
c  in DIMACS:
 13034  13035 -13036 -391 -13037 0
 13034  13035 -13036 -391  13038 0
 13034  13035 -13036 -391 -13039 0

c  2+1 --> break 
c    (-b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧  p_391) -> break
c  in CNF:
c     b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ -p_391 ∨ break
c  in DIMACS:
 13034 -13035  13036 -391 1162 0


c  2-1 --> 1
c    (-b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧ -p_391) -> (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0)
c  in CNF:
c     b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_2
c     b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_1
c     b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨  b^{17, 24}_0
c  in DIMACS:
 13034 -13035  13036  391 -13037 0
 13034 -13035  13036  391 -13038 0
 13034 -13035  13036  391  13039 0

c  1-1 --> 0
c    (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0 ∧ -p_391) -> (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧ -b^{17, 24}_0)
c  in CNF:
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_2
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_1
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_0
c  in DIMACS:
 13034  13035 -13036  391 -13037 0
 13034  13035 -13036  391 -13038 0
 13034  13035 -13036  391 -13039 0

c  0-1 --> -1
c    (-b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧ -p_391) -> ( b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0)
c  in CNF:
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨  b^{17, 24}_2
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_1
c     b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨  b^{17, 24}_0
c  in DIMACS:
 13034  13035  13036  391  13037 0
 13034  13035  13036  391 -13038 0
 13034  13035  13036  391  13039 0

c  -1-1 --> -2
c    ( b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧  b^{17, 23}_0 ∧ -p_391) -> ( b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0)
c  in CNF:
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨  b^{17, 24}_2
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨  b^{17, 24}_1
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨  p_391 ∨ -b^{17, 24}_0
c  in DIMACS:
-13034  13035 -13036  391  13037 0
-13034  13035 -13036  391  13038 0
-13034  13035 -13036  391 -13039 0

c  -2-1 --> break 
c    ( b^{17, 23}_2 ∧  b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧ -p_391) -> break
c  in CNF:
c    -b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨  b^{17, 23}_0 ∨  p_391 ∨ break
c  in DIMACS:
-13034 -13035  13036  391 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 23}_2 ∧ -b^{17, 23}_1 ∧ -b^{17, 23}_0 ∧ true) 
c  in CNF:
c    -b^{17, 23}_2 ∨  b^{17, 23}_1 ∨  b^{17, 23}_0 ∨ false 
c  in DIMACS:
-13034  13035  13036  0

c  3 does not represent an automaton state.
c    -(-b^{17, 23}_2 ∧  b^{17, 23}_1 ∧  b^{17, 23}_0 ∧ true) 
c  in CNF:
c     b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ false 
c  in DIMACS:
 13034 -13035 -13036  0
c  -3 does not represent an automaton state.
c    -( b^{17, 23}_2 ∧  b^{17, 23}_1 ∧  b^{17, 23}_0 ∧ true) 
c  in CNF:
c    -b^{17, 23}_2 ∨ -b^{17, 23}_1 ∨ -b^{17, 23}_0 ∨ false 
c  in DIMACS:
-13034 -13035 -13036  0

c i = 24
c  -2+1 --> -1
c    ( b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧  p_408) -> ( b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0)
c  in CNF:
c    -b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨  b^{17, 25}_2
c    -b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_1
c    -b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨  b^{17, 25}_0
c  in DIMACS:
-13037 -13038  13039 -408  13040 0
-13037 -13038  13039 -408 -13041 0
-13037 -13038  13039 -408  13042 0

c  -1+1 --> 0
c    ( b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0 ∧  p_408) -> (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧ -b^{17, 25}_0)
c  in CNF:
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_2
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_1
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_0
c  in DIMACS:
-13037  13038 -13039 -408 -13040 0
-13037  13038 -13039 -408 -13041 0
-13037  13038 -13039 -408 -13042 0

c  0+1 --> 1
c    (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧  p_408) -> (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0)
c  in CNF:
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_2
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_1
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨  b^{17, 25}_0
c  in DIMACS:
 13037  13038  13039 -408 -13040 0
 13037  13038  13039 -408 -13041 0
 13037  13038  13039 -408  13042 0

c  1+1 --> 2
c    (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0 ∧  p_408) -> (-b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0)
c  in CNF:
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_2
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨  b^{17, 25}_1
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ -p_408 ∨ -b^{17, 25}_0
c  in DIMACS:
 13037  13038 -13039 -408 -13040 0
 13037  13038 -13039 -408  13041 0
 13037  13038 -13039 -408 -13042 0

c  2+1 --> break 
c    (-b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧  p_408) -> break
c  in CNF:
c     b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 13037 -13038  13039 -408 1162 0


c  2-1 --> 1
c    (-b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧ -p_408) -> (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0)
c  in CNF:
c     b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_2
c     b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_1
c     b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨  b^{17, 25}_0
c  in DIMACS:
 13037 -13038  13039  408 -13040 0
 13037 -13038  13039  408 -13041 0
 13037 -13038  13039  408  13042 0

c  1-1 --> 0
c    (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0 ∧ -p_408) -> (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧ -b^{17, 25}_0)
c  in CNF:
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_2
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_1
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_0
c  in DIMACS:
 13037  13038 -13039  408 -13040 0
 13037  13038 -13039  408 -13041 0
 13037  13038 -13039  408 -13042 0

c  0-1 --> -1
c    (-b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧ -p_408) -> ( b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0)
c  in CNF:
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨  b^{17, 25}_2
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_1
c     b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨  b^{17, 25}_0
c  in DIMACS:
 13037  13038  13039  408  13040 0
 13037  13038  13039  408 -13041 0
 13037  13038  13039  408  13042 0

c  -1-1 --> -2
c    ( b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧  b^{17, 24}_0 ∧ -p_408) -> ( b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0)
c  in CNF:
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨  b^{17, 25}_2
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨  b^{17, 25}_1
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨  p_408 ∨ -b^{17, 25}_0
c  in DIMACS:
-13037  13038 -13039  408  13040 0
-13037  13038 -13039  408  13041 0
-13037  13038 -13039  408 -13042 0

c  -2-1 --> break 
c    ( b^{17, 24}_2 ∧  b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨  b^{17, 24}_0 ∨  p_408 ∨ break
c  in DIMACS:
-13037 -13038  13039  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 24}_2 ∧ -b^{17, 24}_1 ∧ -b^{17, 24}_0 ∧ true) 
c  in CNF:
c    -b^{17, 24}_2 ∨  b^{17, 24}_1 ∨  b^{17, 24}_0 ∨ false 
c  in DIMACS:
-13037  13038  13039  0

c  3 does not represent an automaton state.
c    -(-b^{17, 24}_2 ∧  b^{17, 24}_1 ∧  b^{17, 24}_0 ∧ true) 
c  in CNF:
c     b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ false 
c  in DIMACS:
 13037 -13038 -13039  0
c  -3 does not represent an automaton state.
c    -( b^{17, 24}_2 ∧  b^{17, 24}_1 ∧  b^{17, 24}_0 ∧ true) 
c  in CNF:
c    -b^{17, 24}_2 ∨ -b^{17, 24}_1 ∨ -b^{17, 24}_0 ∨ false 
c  in DIMACS:
-13037 -13038 -13039  0

c i = 25
c  -2+1 --> -1
c    ( b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧  p_425) -> ( b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0)
c  in CNF:
c    -b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨  b^{17, 26}_2
c    -b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_1
c    -b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨  b^{17, 26}_0
c  in DIMACS:
-13040 -13041  13042 -425  13043 0
-13040 -13041  13042 -425 -13044 0
-13040 -13041  13042 -425  13045 0

c  -1+1 --> 0
c    ( b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0 ∧  p_425) -> (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧ -b^{17, 26}_0)
c  in CNF:
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_2
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_1
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_0
c  in DIMACS:
-13040  13041 -13042 -425 -13043 0
-13040  13041 -13042 -425 -13044 0
-13040  13041 -13042 -425 -13045 0

c  0+1 --> 1
c    (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧  p_425) -> (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0)
c  in CNF:
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_2
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_1
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨  b^{17, 26}_0
c  in DIMACS:
 13040  13041  13042 -425 -13043 0
 13040  13041  13042 -425 -13044 0
 13040  13041  13042 -425  13045 0

c  1+1 --> 2
c    (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0 ∧  p_425) -> (-b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0)
c  in CNF:
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_2
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨  b^{17, 26}_1
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ -p_425 ∨ -b^{17, 26}_0
c  in DIMACS:
 13040  13041 -13042 -425 -13043 0
 13040  13041 -13042 -425  13044 0
 13040  13041 -13042 -425 -13045 0

c  2+1 --> break 
c    (-b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧  p_425) -> break
c  in CNF:
c     b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ -p_425 ∨ break
c  in DIMACS:
 13040 -13041  13042 -425 1162 0


c  2-1 --> 1
c    (-b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧ -p_425) -> (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0)
c  in CNF:
c     b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_2
c     b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_1
c     b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨  b^{17, 26}_0
c  in DIMACS:
 13040 -13041  13042  425 -13043 0
 13040 -13041  13042  425 -13044 0
 13040 -13041  13042  425  13045 0

c  1-1 --> 0
c    (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0 ∧ -p_425) -> (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧ -b^{17, 26}_0)
c  in CNF:
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_2
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_1
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_0
c  in DIMACS:
 13040  13041 -13042  425 -13043 0
 13040  13041 -13042  425 -13044 0
 13040  13041 -13042  425 -13045 0

c  0-1 --> -1
c    (-b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧ -p_425) -> ( b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0)
c  in CNF:
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨  b^{17, 26}_2
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_1
c     b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨  b^{17, 26}_0
c  in DIMACS:
 13040  13041  13042  425  13043 0
 13040  13041  13042  425 -13044 0
 13040  13041  13042  425  13045 0

c  -1-1 --> -2
c    ( b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧  b^{17, 25}_0 ∧ -p_425) -> ( b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0)
c  in CNF:
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨  b^{17, 26}_2
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨  b^{17, 26}_1
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨  p_425 ∨ -b^{17, 26}_0
c  in DIMACS:
-13040  13041 -13042  425  13043 0
-13040  13041 -13042  425  13044 0
-13040  13041 -13042  425 -13045 0

c  -2-1 --> break 
c    ( b^{17, 25}_2 ∧  b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧ -p_425) -> break
c  in CNF:
c    -b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨  b^{17, 25}_0 ∨  p_425 ∨ break
c  in DIMACS:
-13040 -13041  13042  425 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 25}_2 ∧ -b^{17, 25}_1 ∧ -b^{17, 25}_0 ∧ true) 
c  in CNF:
c    -b^{17, 25}_2 ∨  b^{17, 25}_1 ∨  b^{17, 25}_0 ∨ false 
c  in DIMACS:
-13040  13041  13042  0

c  3 does not represent an automaton state.
c    -(-b^{17, 25}_2 ∧  b^{17, 25}_1 ∧  b^{17, 25}_0 ∧ true) 
c  in CNF:
c     b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ false 
c  in DIMACS:
 13040 -13041 -13042  0
c  -3 does not represent an automaton state.
c    -( b^{17, 25}_2 ∧  b^{17, 25}_1 ∧  b^{17, 25}_0 ∧ true) 
c  in CNF:
c    -b^{17, 25}_2 ∨ -b^{17, 25}_1 ∨ -b^{17, 25}_0 ∨ false 
c  in DIMACS:
-13040 -13041 -13042  0

c i = 26
c  -2+1 --> -1
c    ( b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧  p_442) -> ( b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0)
c  in CNF:
c    -b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨  b^{17, 27}_2
c    -b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_1
c    -b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨  b^{17, 27}_0
c  in DIMACS:
-13043 -13044  13045 -442  13046 0
-13043 -13044  13045 -442 -13047 0
-13043 -13044  13045 -442  13048 0

c  -1+1 --> 0
c    ( b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0 ∧  p_442) -> (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧ -b^{17, 27}_0)
c  in CNF:
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_2
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_1
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_0
c  in DIMACS:
-13043  13044 -13045 -442 -13046 0
-13043  13044 -13045 -442 -13047 0
-13043  13044 -13045 -442 -13048 0

c  0+1 --> 1
c    (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧  p_442) -> (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0)
c  in CNF:
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_2
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_1
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨  b^{17, 27}_0
c  in DIMACS:
 13043  13044  13045 -442 -13046 0
 13043  13044  13045 -442 -13047 0
 13043  13044  13045 -442  13048 0

c  1+1 --> 2
c    (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0 ∧  p_442) -> (-b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0)
c  in CNF:
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_2
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨  b^{17, 27}_1
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ -p_442 ∨ -b^{17, 27}_0
c  in DIMACS:
 13043  13044 -13045 -442 -13046 0
 13043  13044 -13045 -442  13047 0
 13043  13044 -13045 -442 -13048 0

c  2+1 --> break 
c    (-b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧  p_442) -> break
c  in CNF:
c     b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 13043 -13044  13045 -442 1162 0


c  2-1 --> 1
c    (-b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧ -p_442) -> (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0)
c  in CNF:
c     b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_2
c     b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_1
c     b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨  b^{17, 27}_0
c  in DIMACS:
 13043 -13044  13045  442 -13046 0
 13043 -13044  13045  442 -13047 0
 13043 -13044  13045  442  13048 0

c  1-1 --> 0
c    (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0 ∧ -p_442) -> (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧ -b^{17, 27}_0)
c  in CNF:
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_2
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_1
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_0
c  in DIMACS:
 13043  13044 -13045  442 -13046 0
 13043  13044 -13045  442 -13047 0
 13043  13044 -13045  442 -13048 0

c  0-1 --> -1
c    (-b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧ -p_442) -> ( b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0)
c  in CNF:
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨  b^{17, 27}_2
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_1
c     b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨  b^{17, 27}_0
c  in DIMACS:
 13043  13044  13045  442  13046 0
 13043  13044  13045  442 -13047 0
 13043  13044  13045  442  13048 0

c  -1-1 --> -2
c    ( b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧  b^{17, 26}_0 ∧ -p_442) -> ( b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0)
c  in CNF:
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨  b^{17, 27}_2
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨  b^{17, 27}_1
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨  p_442 ∨ -b^{17, 27}_0
c  in DIMACS:
-13043  13044 -13045  442  13046 0
-13043  13044 -13045  442  13047 0
-13043  13044 -13045  442 -13048 0

c  -2-1 --> break 
c    ( b^{17, 26}_2 ∧  b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨  b^{17, 26}_0 ∨  p_442 ∨ break
c  in DIMACS:
-13043 -13044  13045  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 26}_2 ∧ -b^{17, 26}_1 ∧ -b^{17, 26}_0 ∧ true) 
c  in CNF:
c    -b^{17, 26}_2 ∨  b^{17, 26}_1 ∨  b^{17, 26}_0 ∨ false 
c  in DIMACS:
-13043  13044  13045  0

c  3 does not represent an automaton state.
c    -(-b^{17, 26}_2 ∧  b^{17, 26}_1 ∧  b^{17, 26}_0 ∧ true) 
c  in CNF:
c     b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ false 
c  in DIMACS:
 13043 -13044 -13045  0
c  -3 does not represent an automaton state.
c    -( b^{17, 26}_2 ∧  b^{17, 26}_1 ∧  b^{17, 26}_0 ∧ true) 
c  in CNF:
c    -b^{17, 26}_2 ∨ -b^{17, 26}_1 ∨ -b^{17, 26}_0 ∨ false 
c  in DIMACS:
-13043 -13044 -13045  0

c i = 27
c  -2+1 --> -1
c    ( b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧  p_459) -> ( b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0)
c  in CNF:
c    -b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨  b^{17, 28}_2
c    -b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_1
c    -b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨  b^{17, 28}_0
c  in DIMACS:
-13046 -13047  13048 -459  13049 0
-13046 -13047  13048 -459 -13050 0
-13046 -13047  13048 -459  13051 0

c  -1+1 --> 0
c    ( b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0 ∧  p_459) -> (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧ -b^{17, 28}_0)
c  in CNF:
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_2
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_1
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_0
c  in DIMACS:
-13046  13047 -13048 -459 -13049 0
-13046  13047 -13048 -459 -13050 0
-13046  13047 -13048 -459 -13051 0

c  0+1 --> 1
c    (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧  p_459) -> (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0)
c  in CNF:
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_2
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_1
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨  b^{17, 28}_0
c  in DIMACS:
 13046  13047  13048 -459 -13049 0
 13046  13047  13048 -459 -13050 0
 13046  13047  13048 -459  13051 0

c  1+1 --> 2
c    (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0 ∧  p_459) -> (-b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0)
c  in CNF:
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_2
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨  b^{17, 28}_1
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ -p_459 ∨ -b^{17, 28}_0
c  in DIMACS:
 13046  13047 -13048 -459 -13049 0
 13046  13047 -13048 -459  13050 0
 13046  13047 -13048 -459 -13051 0

c  2+1 --> break 
c    (-b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧  p_459) -> break
c  in CNF:
c     b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 13046 -13047  13048 -459 1162 0


c  2-1 --> 1
c    (-b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧ -p_459) -> (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0)
c  in CNF:
c     b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_2
c     b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_1
c     b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨  b^{17, 28}_0
c  in DIMACS:
 13046 -13047  13048  459 -13049 0
 13046 -13047  13048  459 -13050 0
 13046 -13047  13048  459  13051 0

c  1-1 --> 0
c    (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0 ∧ -p_459) -> (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧ -b^{17, 28}_0)
c  in CNF:
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_2
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_1
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_0
c  in DIMACS:
 13046  13047 -13048  459 -13049 0
 13046  13047 -13048  459 -13050 0
 13046  13047 -13048  459 -13051 0

c  0-1 --> -1
c    (-b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧ -p_459) -> ( b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0)
c  in CNF:
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨  b^{17, 28}_2
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_1
c     b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨  b^{17, 28}_0
c  in DIMACS:
 13046  13047  13048  459  13049 0
 13046  13047  13048  459 -13050 0
 13046  13047  13048  459  13051 0

c  -1-1 --> -2
c    ( b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧  b^{17, 27}_0 ∧ -p_459) -> ( b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0)
c  in CNF:
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨  b^{17, 28}_2
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨  b^{17, 28}_1
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨  p_459 ∨ -b^{17, 28}_0
c  in DIMACS:
-13046  13047 -13048  459  13049 0
-13046  13047 -13048  459  13050 0
-13046  13047 -13048  459 -13051 0

c  -2-1 --> break 
c    ( b^{17, 27}_2 ∧  b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨  b^{17, 27}_0 ∨  p_459 ∨ break
c  in DIMACS:
-13046 -13047  13048  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 27}_2 ∧ -b^{17, 27}_1 ∧ -b^{17, 27}_0 ∧ true) 
c  in CNF:
c    -b^{17, 27}_2 ∨  b^{17, 27}_1 ∨  b^{17, 27}_0 ∨ false 
c  in DIMACS:
-13046  13047  13048  0

c  3 does not represent an automaton state.
c    -(-b^{17, 27}_2 ∧  b^{17, 27}_1 ∧  b^{17, 27}_0 ∧ true) 
c  in CNF:
c     b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ false 
c  in DIMACS:
 13046 -13047 -13048  0
c  -3 does not represent an automaton state.
c    -( b^{17, 27}_2 ∧  b^{17, 27}_1 ∧  b^{17, 27}_0 ∧ true) 
c  in CNF:
c    -b^{17, 27}_2 ∨ -b^{17, 27}_1 ∨ -b^{17, 27}_0 ∨ false 
c  in DIMACS:
-13046 -13047 -13048  0

c i = 28
c  -2+1 --> -1
c    ( b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧  p_476) -> ( b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0)
c  in CNF:
c    -b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨  b^{17, 29}_2
c    -b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_1
c    -b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨  b^{17, 29}_0
c  in DIMACS:
-13049 -13050  13051 -476  13052 0
-13049 -13050  13051 -476 -13053 0
-13049 -13050  13051 -476  13054 0

c  -1+1 --> 0
c    ( b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0 ∧  p_476) -> (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧ -b^{17, 29}_0)
c  in CNF:
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_2
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_1
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_0
c  in DIMACS:
-13049  13050 -13051 -476 -13052 0
-13049  13050 -13051 -476 -13053 0
-13049  13050 -13051 -476 -13054 0

c  0+1 --> 1
c    (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧  p_476) -> (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0)
c  in CNF:
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_2
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_1
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨  b^{17, 29}_0
c  in DIMACS:
 13049  13050  13051 -476 -13052 0
 13049  13050  13051 -476 -13053 0
 13049  13050  13051 -476  13054 0

c  1+1 --> 2
c    (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0 ∧  p_476) -> (-b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0)
c  in CNF:
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_2
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨  b^{17, 29}_1
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ -p_476 ∨ -b^{17, 29}_0
c  in DIMACS:
 13049  13050 -13051 -476 -13052 0
 13049  13050 -13051 -476  13053 0
 13049  13050 -13051 -476 -13054 0

c  2+1 --> break 
c    (-b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧  p_476) -> break
c  in CNF:
c     b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 13049 -13050  13051 -476 1162 0


c  2-1 --> 1
c    (-b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧ -p_476) -> (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0)
c  in CNF:
c     b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_2
c     b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_1
c     b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨  b^{17, 29}_0
c  in DIMACS:
 13049 -13050  13051  476 -13052 0
 13049 -13050  13051  476 -13053 0
 13049 -13050  13051  476  13054 0

c  1-1 --> 0
c    (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0 ∧ -p_476) -> (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧ -b^{17, 29}_0)
c  in CNF:
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_2
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_1
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_0
c  in DIMACS:
 13049  13050 -13051  476 -13052 0
 13049  13050 -13051  476 -13053 0
 13049  13050 -13051  476 -13054 0

c  0-1 --> -1
c    (-b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧ -p_476) -> ( b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0)
c  in CNF:
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨  b^{17, 29}_2
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_1
c     b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨  b^{17, 29}_0
c  in DIMACS:
 13049  13050  13051  476  13052 0
 13049  13050  13051  476 -13053 0
 13049  13050  13051  476  13054 0

c  -1-1 --> -2
c    ( b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧  b^{17, 28}_0 ∧ -p_476) -> ( b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0)
c  in CNF:
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨  b^{17, 29}_2
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨  b^{17, 29}_1
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨  p_476 ∨ -b^{17, 29}_0
c  in DIMACS:
-13049  13050 -13051  476  13052 0
-13049  13050 -13051  476  13053 0
-13049  13050 -13051  476 -13054 0

c  -2-1 --> break 
c    ( b^{17, 28}_2 ∧  b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨  b^{17, 28}_0 ∨  p_476 ∨ break
c  in DIMACS:
-13049 -13050  13051  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 28}_2 ∧ -b^{17, 28}_1 ∧ -b^{17, 28}_0 ∧ true) 
c  in CNF:
c    -b^{17, 28}_2 ∨  b^{17, 28}_1 ∨  b^{17, 28}_0 ∨ false 
c  in DIMACS:
-13049  13050  13051  0

c  3 does not represent an automaton state.
c    -(-b^{17, 28}_2 ∧  b^{17, 28}_1 ∧  b^{17, 28}_0 ∧ true) 
c  in CNF:
c     b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ false 
c  in DIMACS:
 13049 -13050 -13051  0
c  -3 does not represent an automaton state.
c    -( b^{17, 28}_2 ∧  b^{17, 28}_1 ∧  b^{17, 28}_0 ∧ true) 
c  in CNF:
c    -b^{17, 28}_2 ∨ -b^{17, 28}_1 ∨ -b^{17, 28}_0 ∨ false 
c  in DIMACS:
-13049 -13050 -13051  0

c i = 29
c  -2+1 --> -1
c    ( b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧  p_493) -> ( b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0)
c  in CNF:
c    -b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨  b^{17, 30}_2
c    -b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_1
c    -b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨  b^{17, 30}_0
c  in DIMACS:
-13052 -13053  13054 -493  13055 0
-13052 -13053  13054 -493 -13056 0
-13052 -13053  13054 -493  13057 0

c  -1+1 --> 0
c    ( b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0 ∧  p_493) -> (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧ -b^{17, 30}_0)
c  in CNF:
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_2
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_1
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_0
c  in DIMACS:
-13052  13053 -13054 -493 -13055 0
-13052  13053 -13054 -493 -13056 0
-13052  13053 -13054 -493 -13057 0

c  0+1 --> 1
c    (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧  p_493) -> (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0)
c  in CNF:
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_2
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_1
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨  b^{17, 30}_0
c  in DIMACS:
 13052  13053  13054 -493 -13055 0
 13052  13053  13054 -493 -13056 0
 13052  13053  13054 -493  13057 0

c  1+1 --> 2
c    (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0 ∧  p_493) -> (-b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0)
c  in CNF:
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_2
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨  b^{17, 30}_1
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ -p_493 ∨ -b^{17, 30}_0
c  in DIMACS:
 13052  13053 -13054 -493 -13055 0
 13052  13053 -13054 -493  13056 0
 13052  13053 -13054 -493 -13057 0

c  2+1 --> break 
c    (-b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧  p_493) -> break
c  in CNF:
c     b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ -p_493 ∨ break
c  in DIMACS:
 13052 -13053  13054 -493 1162 0


c  2-1 --> 1
c    (-b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧ -p_493) -> (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0)
c  in CNF:
c     b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_2
c     b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_1
c     b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨  b^{17, 30}_0
c  in DIMACS:
 13052 -13053  13054  493 -13055 0
 13052 -13053  13054  493 -13056 0
 13052 -13053  13054  493  13057 0

c  1-1 --> 0
c    (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0 ∧ -p_493) -> (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧ -b^{17, 30}_0)
c  in CNF:
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_2
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_1
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_0
c  in DIMACS:
 13052  13053 -13054  493 -13055 0
 13052  13053 -13054  493 -13056 0
 13052  13053 -13054  493 -13057 0

c  0-1 --> -1
c    (-b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧ -p_493) -> ( b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0)
c  in CNF:
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨  b^{17, 30}_2
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_1
c     b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨  b^{17, 30}_0
c  in DIMACS:
 13052  13053  13054  493  13055 0
 13052  13053  13054  493 -13056 0
 13052  13053  13054  493  13057 0

c  -1-1 --> -2
c    ( b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧  b^{17, 29}_0 ∧ -p_493) -> ( b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0)
c  in CNF:
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨  b^{17, 30}_2
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨  b^{17, 30}_1
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨  p_493 ∨ -b^{17, 30}_0
c  in DIMACS:
-13052  13053 -13054  493  13055 0
-13052  13053 -13054  493  13056 0
-13052  13053 -13054  493 -13057 0

c  -2-1 --> break 
c    ( b^{17, 29}_2 ∧  b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧ -p_493) -> break
c  in CNF:
c    -b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨  b^{17, 29}_0 ∨  p_493 ∨ break
c  in DIMACS:
-13052 -13053  13054  493 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 29}_2 ∧ -b^{17, 29}_1 ∧ -b^{17, 29}_0 ∧ true) 
c  in CNF:
c    -b^{17, 29}_2 ∨  b^{17, 29}_1 ∨  b^{17, 29}_0 ∨ false 
c  in DIMACS:
-13052  13053  13054  0

c  3 does not represent an automaton state.
c    -(-b^{17, 29}_2 ∧  b^{17, 29}_1 ∧  b^{17, 29}_0 ∧ true) 
c  in CNF:
c     b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ false 
c  in DIMACS:
 13052 -13053 -13054  0
c  -3 does not represent an automaton state.
c    -( b^{17, 29}_2 ∧  b^{17, 29}_1 ∧  b^{17, 29}_0 ∧ true) 
c  in CNF:
c    -b^{17, 29}_2 ∨ -b^{17, 29}_1 ∨ -b^{17, 29}_0 ∨ false 
c  in DIMACS:
-13052 -13053 -13054  0

c i = 30
c  -2+1 --> -1
c    ( b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧  p_510) -> ( b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0)
c  in CNF:
c    -b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨  b^{17, 31}_2
c    -b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_1
c    -b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨  b^{17, 31}_0
c  in DIMACS:
-13055 -13056  13057 -510  13058 0
-13055 -13056  13057 -510 -13059 0
-13055 -13056  13057 -510  13060 0

c  -1+1 --> 0
c    ( b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0 ∧  p_510) -> (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧ -b^{17, 31}_0)
c  in CNF:
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_2
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_1
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_0
c  in DIMACS:
-13055  13056 -13057 -510 -13058 0
-13055  13056 -13057 -510 -13059 0
-13055  13056 -13057 -510 -13060 0

c  0+1 --> 1
c    (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧  p_510) -> (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0)
c  in CNF:
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_2
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_1
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨  b^{17, 31}_0
c  in DIMACS:
 13055  13056  13057 -510 -13058 0
 13055  13056  13057 -510 -13059 0
 13055  13056  13057 -510  13060 0

c  1+1 --> 2
c    (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0 ∧  p_510) -> (-b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0)
c  in CNF:
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_2
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨  b^{17, 31}_1
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ -p_510 ∨ -b^{17, 31}_0
c  in DIMACS:
 13055  13056 -13057 -510 -13058 0
 13055  13056 -13057 -510  13059 0
 13055  13056 -13057 -510 -13060 0

c  2+1 --> break 
c    (-b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧  p_510) -> break
c  in CNF:
c     b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 13055 -13056  13057 -510 1162 0


c  2-1 --> 1
c    (-b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧ -p_510) -> (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0)
c  in CNF:
c     b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_2
c     b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_1
c     b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨  b^{17, 31}_0
c  in DIMACS:
 13055 -13056  13057  510 -13058 0
 13055 -13056  13057  510 -13059 0
 13055 -13056  13057  510  13060 0

c  1-1 --> 0
c    (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0 ∧ -p_510) -> (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧ -b^{17, 31}_0)
c  in CNF:
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_2
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_1
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_0
c  in DIMACS:
 13055  13056 -13057  510 -13058 0
 13055  13056 -13057  510 -13059 0
 13055  13056 -13057  510 -13060 0

c  0-1 --> -1
c    (-b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧ -p_510) -> ( b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0)
c  in CNF:
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨  b^{17, 31}_2
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_1
c     b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨  b^{17, 31}_0
c  in DIMACS:
 13055  13056  13057  510  13058 0
 13055  13056  13057  510 -13059 0
 13055  13056  13057  510  13060 0

c  -1-1 --> -2
c    ( b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧  b^{17, 30}_0 ∧ -p_510) -> ( b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0)
c  in CNF:
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨  b^{17, 31}_2
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨  b^{17, 31}_1
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨  p_510 ∨ -b^{17, 31}_0
c  in DIMACS:
-13055  13056 -13057  510  13058 0
-13055  13056 -13057  510  13059 0
-13055  13056 -13057  510 -13060 0

c  -2-1 --> break 
c    ( b^{17, 30}_2 ∧  b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨  b^{17, 30}_0 ∨  p_510 ∨ break
c  in DIMACS:
-13055 -13056  13057  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 30}_2 ∧ -b^{17, 30}_1 ∧ -b^{17, 30}_0 ∧ true) 
c  in CNF:
c    -b^{17, 30}_2 ∨  b^{17, 30}_1 ∨  b^{17, 30}_0 ∨ false 
c  in DIMACS:
-13055  13056  13057  0

c  3 does not represent an automaton state.
c    -(-b^{17, 30}_2 ∧  b^{17, 30}_1 ∧  b^{17, 30}_0 ∧ true) 
c  in CNF:
c     b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ false 
c  in DIMACS:
 13055 -13056 -13057  0
c  -3 does not represent an automaton state.
c    -( b^{17, 30}_2 ∧  b^{17, 30}_1 ∧  b^{17, 30}_0 ∧ true) 
c  in CNF:
c    -b^{17, 30}_2 ∨ -b^{17, 30}_1 ∨ -b^{17, 30}_0 ∨ false 
c  in DIMACS:
-13055 -13056 -13057  0

c i = 31
c  -2+1 --> -1
c    ( b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧  p_527) -> ( b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0)
c  in CNF:
c    -b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨  b^{17, 32}_2
c    -b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_1
c    -b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨  b^{17, 32}_0
c  in DIMACS:
-13058 -13059  13060 -527  13061 0
-13058 -13059  13060 -527 -13062 0
-13058 -13059  13060 -527  13063 0

c  -1+1 --> 0
c    ( b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0 ∧  p_527) -> (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧ -b^{17, 32}_0)
c  in CNF:
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_2
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_1
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_0
c  in DIMACS:
-13058  13059 -13060 -527 -13061 0
-13058  13059 -13060 -527 -13062 0
-13058  13059 -13060 -527 -13063 0

c  0+1 --> 1
c    (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧  p_527) -> (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0)
c  in CNF:
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_2
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_1
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨  b^{17, 32}_0
c  in DIMACS:
 13058  13059  13060 -527 -13061 0
 13058  13059  13060 -527 -13062 0
 13058  13059  13060 -527  13063 0

c  1+1 --> 2
c    (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0 ∧  p_527) -> (-b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0)
c  in CNF:
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_2
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨  b^{17, 32}_1
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ -p_527 ∨ -b^{17, 32}_0
c  in DIMACS:
 13058  13059 -13060 -527 -13061 0
 13058  13059 -13060 -527  13062 0
 13058  13059 -13060 -527 -13063 0

c  2+1 --> break 
c    (-b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧  p_527) -> break
c  in CNF:
c     b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ -p_527 ∨ break
c  in DIMACS:
 13058 -13059  13060 -527 1162 0


c  2-1 --> 1
c    (-b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧ -p_527) -> (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0)
c  in CNF:
c     b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_2
c     b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_1
c     b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨  b^{17, 32}_0
c  in DIMACS:
 13058 -13059  13060  527 -13061 0
 13058 -13059  13060  527 -13062 0
 13058 -13059  13060  527  13063 0

c  1-1 --> 0
c    (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0 ∧ -p_527) -> (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧ -b^{17, 32}_0)
c  in CNF:
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_2
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_1
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_0
c  in DIMACS:
 13058  13059 -13060  527 -13061 0
 13058  13059 -13060  527 -13062 0
 13058  13059 -13060  527 -13063 0

c  0-1 --> -1
c    (-b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧ -p_527) -> ( b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0)
c  in CNF:
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨  b^{17, 32}_2
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_1
c     b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨  b^{17, 32}_0
c  in DIMACS:
 13058  13059  13060  527  13061 0
 13058  13059  13060  527 -13062 0
 13058  13059  13060  527  13063 0

c  -1-1 --> -2
c    ( b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧  b^{17, 31}_0 ∧ -p_527) -> ( b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0)
c  in CNF:
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨  b^{17, 32}_2
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨  b^{17, 32}_1
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨  p_527 ∨ -b^{17, 32}_0
c  in DIMACS:
-13058  13059 -13060  527  13061 0
-13058  13059 -13060  527  13062 0
-13058  13059 -13060  527 -13063 0

c  -2-1 --> break 
c    ( b^{17, 31}_2 ∧  b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧ -p_527) -> break
c  in CNF:
c    -b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨  b^{17, 31}_0 ∨  p_527 ∨ break
c  in DIMACS:
-13058 -13059  13060  527 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 31}_2 ∧ -b^{17, 31}_1 ∧ -b^{17, 31}_0 ∧ true) 
c  in CNF:
c    -b^{17, 31}_2 ∨  b^{17, 31}_1 ∨  b^{17, 31}_0 ∨ false 
c  in DIMACS:
-13058  13059  13060  0

c  3 does not represent an automaton state.
c    -(-b^{17, 31}_2 ∧  b^{17, 31}_1 ∧  b^{17, 31}_0 ∧ true) 
c  in CNF:
c     b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ false 
c  in DIMACS:
 13058 -13059 -13060  0
c  -3 does not represent an automaton state.
c    -( b^{17, 31}_2 ∧  b^{17, 31}_1 ∧  b^{17, 31}_0 ∧ true) 
c  in CNF:
c    -b^{17, 31}_2 ∨ -b^{17, 31}_1 ∨ -b^{17, 31}_0 ∨ false 
c  in DIMACS:
-13058 -13059 -13060  0

c i = 32
c  -2+1 --> -1
c    ( b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧  p_544) -> ( b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0)
c  in CNF:
c    -b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨  b^{17, 33}_2
c    -b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_1
c    -b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨  b^{17, 33}_0
c  in DIMACS:
-13061 -13062  13063 -544  13064 0
-13061 -13062  13063 -544 -13065 0
-13061 -13062  13063 -544  13066 0

c  -1+1 --> 0
c    ( b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0 ∧  p_544) -> (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧ -b^{17, 33}_0)
c  in CNF:
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_2
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_1
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_0
c  in DIMACS:
-13061  13062 -13063 -544 -13064 0
-13061  13062 -13063 -544 -13065 0
-13061  13062 -13063 -544 -13066 0

c  0+1 --> 1
c    (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧  p_544) -> (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0)
c  in CNF:
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_2
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_1
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨  b^{17, 33}_0
c  in DIMACS:
 13061  13062  13063 -544 -13064 0
 13061  13062  13063 -544 -13065 0
 13061  13062  13063 -544  13066 0

c  1+1 --> 2
c    (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0 ∧  p_544) -> (-b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0)
c  in CNF:
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_2
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨  b^{17, 33}_1
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ -p_544 ∨ -b^{17, 33}_0
c  in DIMACS:
 13061  13062 -13063 -544 -13064 0
 13061  13062 -13063 -544  13065 0
 13061  13062 -13063 -544 -13066 0

c  2+1 --> break 
c    (-b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧  p_544) -> break
c  in CNF:
c     b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 13061 -13062  13063 -544 1162 0


c  2-1 --> 1
c    (-b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧ -p_544) -> (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0)
c  in CNF:
c     b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_2
c     b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_1
c     b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨  b^{17, 33}_0
c  in DIMACS:
 13061 -13062  13063  544 -13064 0
 13061 -13062  13063  544 -13065 0
 13061 -13062  13063  544  13066 0

c  1-1 --> 0
c    (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0 ∧ -p_544) -> (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧ -b^{17, 33}_0)
c  in CNF:
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_2
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_1
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_0
c  in DIMACS:
 13061  13062 -13063  544 -13064 0
 13061  13062 -13063  544 -13065 0
 13061  13062 -13063  544 -13066 0

c  0-1 --> -1
c    (-b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧ -p_544) -> ( b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0)
c  in CNF:
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨  b^{17, 33}_2
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_1
c     b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨  b^{17, 33}_0
c  in DIMACS:
 13061  13062  13063  544  13064 0
 13061  13062  13063  544 -13065 0
 13061  13062  13063  544  13066 0

c  -1-1 --> -2
c    ( b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧  b^{17, 32}_0 ∧ -p_544) -> ( b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0)
c  in CNF:
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨  b^{17, 33}_2
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨  b^{17, 33}_1
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨  p_544 ∨ -b^{17, 33}_0
c  in DIMACS:
-13061  13062 -13063  544  13064 0
-13061  13062 -13063  544  13065 0
-13061  13062 -13063  544 -13066 0

c  -2-1 --> break 
c    ( b^{17, 32}_2 ∧  b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨  b^{17, 32}_0 ∨  p_544 ∨ break
c  in DIMACS:
-13061 -13062  13063  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 32}_2 ∧ -b^{17, 32}_1 ∧ -b^{17, 32}_0 ∧ true) 
c  in CNF:
c    -b^{17, 32}_2 ∨  b^{17, 32}_1 ∨  b^{17, 32}_0 ∨ false 
c  in DIMACS:
-13061  13062  13063  0

c  3 does not represent an automaton state.
c    -(-b^{17, 32}_2 ∧  b^{17, 32}_1 ∧  b^{17, 32}_0 ∧ true) 
c  in CNF:
c     b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ false 
c  in DIMACS:
 13061 -13062 -13063  0
c  -3 does not represent an automaton state.
c    -( b^{17, 32}_2 ∧  b^{17, 32}_1 ∧  b^{17, 32}_0 ∧ true) 
c  in CNF:
c    -b^{17, 32}_2 ∨ -b^{17, 32}_1 ∨ -b^{17, 32}_0 ∨ false 
c  in DIMACS:
-13061 -13062 -13063  0

c i = 33
c  -2+1 --> -1
c    ( b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧  p_561) -> ( b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0)
c  in CNF:
c    -b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨  b^{17, 34}_2
c    -b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_1
c    -b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨  b^{17, 34}_0
c  in DIMACS:
-13064 -13065  13066 -561  13067 0
-13064 -13065  13066 -561 -13068 0
-13064 -13065  13066 -561  13069 0

c  -1+1 --> 0
c    ( b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0 ∧  p_561) -> (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧ -b^{17, 34}_0)
c  in CNF:
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_2
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_1
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_0
c  in DIMACS:
-13064  13065 -13066 -561 -13067 0
-13064  13065 -13066 -561 -13068 0
-13064  13065 -13066 -561 -13069 0

c  0+1 --> 1
c    (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧  p_561) -> (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0)
c  in CNF:
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_2
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_1
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨  b^{17, 34}_0
c  in DIMACS:
 13064  13065  13066 -561 -13067 0
 13064  13065  13066 -561 -13068 0
 13064  13065  13066 -561  13069 0

c  1+1 --> 2
c    (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0 ∧  p_561) -> (-b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0)
c  in CNF:
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_2
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨  b^{17, 34}_1
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ -p_561 ∨ -b^{17, 34}_0
c  in DIMACS:
 13064  13065 -13066 -561 -13067 0
 13064  13065 -13066 -561  13068 0
 13064  13065 -13066 -561 -13069 0

c  2+1 --> break 
c    (-b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧  p_561) -> break
c  in CNF:
c     b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 13064 -13065  13066 -561 1162 0


c  2-1 --> 1
c    (-b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧ -p_561) -> (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0)
c  in CNF:
c     b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_2
c     b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_1
c     b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨  b^{17, 34}_0
c  in DIMACS:
 13064 -13065  13066  561 -13067 0
 13064 -13065  13066  561 -13068 0
 13064 -13065  13066  561  13069 0

c  1-1 --> 0
c    (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0 ∧ -p_561) -> (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧ -b^{17, 34}_0)
c  in CNF:
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_2
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_1
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_0
c  in DIMACS:
 13064  13065 -13066  561 -13067 0
 13064  13065 -13066  561 -13068 0
 13064  13065 -13066  561 -13069 0

c  0-1 --> -1
c    (-b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧ -p_561) -> ( b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0)
c  in CNF:
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨  b^{17, 34}_2
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_1
c     b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨  b^{17, 34}_0
c  in DIMACS:
 13064  13065  13066  561  13067 0
 13064  13065  13066  561 -13068 0
 13064  13065  13066  561  13069 0

c  -1-1 --> -2
c    ( b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧  b^{17, 33}_0 ∧ -p_561) -> ( b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0)
c  in CNF:
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨  b^{17, 34}_2
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨  b^{17, 34}_1
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨  p_561 ∨ -b^{17, 34}_0
c  in DIMACS:
-13064  13065 -13066  561  13067 0
-13064  13065 -13066  561  13068 0
-13064  13065 -13066  561 -13069 0

c  -2-1 --> break 
c    ( b^{17, 33}_2 ∧  b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨  b^{17, 33}_0 ∨  p_561 ∨ break
c  in DIMACS:
-13064 -13065  13066  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 33}_2 ∧ -b^{17, 33}_1 ∧ -b^{17, 33}_0 ∧ true) 
c  in CNF:
c    -b^{17, 33}_2 ∨  b^{17, 33}_1 ∨  b^{17, 33}_0 ∨ false 
c  in DIMACS:
-13064  13065  13066  0

c  3 does not represent an automaton state.
c    -(-b^{17, 33}_2 ∧  b^{17, 33}_1 ∧  b^{17, 33}_0 ∧ true) 
c  in CNF:
c     b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ false 
c  in DIMACS:
 13064 -13065 -13066  0
c  -3 does not represent an automaton state.
c    -( b^{17, 33}_2 ∧  b^{17, 33}_1 ∧  b^{17, 33}_0 ∧ true) 
c  in CNF:
c    -b^{17, 33}_2 ∨ -b^{17, 33}_1 ∨ -b^{17, 33}_0 ∨ false 
c  in DIMACS:
-13064 -13065 -13066  0

c i = 34
c  -2+1 --> -1
c    ( b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧  p_578) -> ( b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0)
c  in CNF:
c    -b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨  b^{17, 35}_2
c    -b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_1
c    -b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨  b^{17, 35}_0
c  in DIMACS:
-13067 -13068  13069 -578  13070 0
-13067 -13068  13069 -578 -13071 0
-13067 -13068  13069 -578  13072 0

c  -1+1 --> 0
c    ( b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0 ∧  p_578) -> (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧ -b^{17, 35}_0)
c  in CNF:
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_2
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_1
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_0
c  in DIMACS:
-13067  13068 -13069 -578 -13070 0
-13067  13068 -13069 -578 -13071 0
-13067  13068 -13069 -578 -13072 0

c  0+1 --> 1
c    (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧  p_578) -> (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0)
c  in CNF:
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_2
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_1
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨  b^{17, 35}_0
c  in DIMACS:
 13067  13068  13069 -578 -13070 0
 13067  13068  13069 -578 -13071 0
 13067  13068  13069 -578  13072 0

c  1+1 --> 2
c    (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0 ∧  p_578) -> (-b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0)
c  in CNF:
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_2
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨  b^{17, 35}_1
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ -p_578 ∨ -b^{17, 35}_0
c  in DIMACS:
 13067  13068 -13069 -578 -13070 0
 13067  13068 -13069 -578  13071 0
 13067  13068 -13069 -578 -13072 0

c  2+1 --> break 
c    (-b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧  p_578) -> break
c  in CNF:
c     b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ -p_578 ∨ break
c  in DIMACS:
 13067 -13068  13069 -578 1162 0


c  2-1 --> 1
c    (-b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧ -p_578) -> (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0)
c  in CNF:
c     b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_2
c     b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_1
c     b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨  b^{17, 35}_0
c  in DIMACS:
 13067 -13068  13069  578 -13070 0
 13067 -13068  13069  578 -13071 0
 13067 -13068  13069  578  13072 0

c  1-1 --> 0
c    (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0 ∧ -p_578) -> (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧ -b^{17, 35}_0)
c  in CNF:
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_2
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_1
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_0
c  in DIMACS:
 13067  13068 -13069  578 -13070 0
 13067  13068 -13069  578 -13071 0
 13067  13068 -13069  578 -13072 0

c  0-1 --> -1
c    (-b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧ -p_578) -> ( b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0)
c  in CNF:
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨  b^{17, 35}_2
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_1
c     b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨  b^{17, 35}_0
c  in DIMACS:
 13067  13068  13069  578  13070 0
 13067  13068  13069  578 -13071 0
 13067  13068  13069  578  13072 0

c  -1-1 --> -2
c    ( b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧  b^{17, 34}_0 ∧ -p_578) -> ( b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0)
c  in CNF:
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨  b^{17, 35}_2
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨  b^{17, 35}_1
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨  p_578 ∨ -b^{17, 35}_0
c  in DIMACS:
-13067  13068 -13069  578  13070 0
-13067  13068 -13069  578  13071 0
-13067  13068 -13069  578 -13072 0

c  -2-1 --> break 
c    ( b^{17, 34}_2 ∧  b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧ -p_578) -> break
c  in CNF:
c    -b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨  b^{17, 34}_0 ∨  p_578 ∨ break
c  in DIMACS:
-13067 -13068  13069  578 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 34}_2 ∧ -b^{17, 34}_1 ∧ -b^{17, 34}_0 ∧ true) 
c  in CNF:
c    -b^{17, 34}_2 ∨  b^{17, 34}_1 ∨  b^{17, 34}_0 ∨ false 
c  in DIMACS:
-13067  13068  13069  0

c  3 does not represent an automaton state.
c    -(-b^{17, 34}_2 ∧  b^{17, 34}_1 ∧  b^{17, 34}_0 ∧ true) 
c  in CNF:
c     b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ false 
c  in DIMACS:
 13067 -13068 -13069  0
c  -3 does not represent an automaton state.
c    -( b^{17, 34}_2 ∧  b^{17, 34}_1 ∧  b^{17, 34}_0 ∧ true) 
c  in CNF:
c    -b^{17, 34}_2 ∨ -b^{17, 34}_1 ∨ -b^{17, 34}_0 ∨ false 
c  in DIMACS:
-13067 -13068 -13069  0

c i = 35
c  -2+1 --> -1
c    ( b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧  p_595) -> ( b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0)
c  in CNF:
c    -b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨  b^{17, 36}_2
c    -b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_1
c    -b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨  b^{17, 36}_0
c  in DIMACS:
-13070 -13071  13072 -595  13073 0
-13070 -13071  13072 -595 -13074 0
-13070 -13071  13072 -595  13075 0

c  -1+1 --> 0
c    ( b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0 ∧  p_595) -> (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧ -b^{17, 36}_0)
c  in CNF:
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_2
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_1
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_0
c  in DIMACS:
-13070  13071 -13072 -595 -13073 0
-13070  13071 -13072 -595 -13074 0
-13070  13071 -13072 -595 -13075 0

c  0+1 --> 1
c    (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧  p_595) -> (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0)
c  in CNF:
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_2
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_1
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨  b^{17, 36}_0
c  in DIMACS:
 13070  13071  13072 -595 -13073 0
 13070  13071  13072 -595 -13074 0
 13070  13071  13072 -595  13075 0

c  1+1 --> 2
c    (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0 ∧  p_595) -> (-b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0)
c  in CNF:
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_2
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨  b^{17, 36}_1
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ -p_595 ∨ -b^{17, 36}_0
c  in DIMACS:
 13070  13071 -13072 -595 -13073 0
 13070  13071 -13072 -595  13074 0
 13070  13071 -13072 -595 -13075 0

c  2+1 --> break 
c    (-b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧  p_595) -> break
c  in CNF:
c     b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 13070 -13071  13072 -595 1162 0


c  2-1 --> 1
c    (-b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧ -p_595) -> (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0)
c  in CNF:
c     b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_2
c     b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_1
c     b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨  b^{17, 36}_0
c  in DIMACS:
 13070 -13071  13072  595 -13073 0
 13070 -13071  13072  595 -13074 0
 13070 -13071  13072  595  13075 0

c  1-1 --> 0
c    (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0 ∧ -p_595) -> (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧ -b^{17, 36}_0)
c  in CNF:
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_2
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_1
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_0
c  in DIMACS:
 13070  13071 -13072  595 -13073 0
 13070  13071 -13072  595 -13074 0
 13070  13071 -13072  595 -13075 0

c  0-1 --> -1
c    (-b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧ -p_595) -> ( b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0)
c  in CNF:
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨  b^{17, 36}_2
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_1
c     b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨  b^{17, 36}_0
c  in DIMACS:
 13070  13071  13072  595  13073 0
 13070  13071  13072  595 -13074 0
 13070  13071  13072  595  13075 0

c  -1-1 --> -2
c    ( b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧  b^{17, 35}_0 ∧ -p_595) -> ( b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0)
c  in CNF:
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨  b^{17, 36}_2
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨  b^{17, 36}_1
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨  p_595 ∨ -b^{17, 36}_0
c  in DIMACS:
-13070  13071 -13072  595  13073 0
-13070  13071 -13072  595  13074 0
-13070  13071 -13072  595 -13075 0

c  -2-1 --> break 
c    ( b^{17, 35}_2 ∧  b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨  b^{17, 35}_0 ∨  p_595 ∨ break
c  in DIMACS:
-13070 -13071  13072  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 35}_2 ∧ -b^{17, 35}_1 ∧ -b^{17, 35}_0 ∧ true) 
c  in CNF:
c    -b^{17, 35}_2 ∨  b^{17, 35}_1 ∨  b^{17, 35}_0 ∨ false 
c  in DIMACS:
-13070  13071  13072  0

c  3 does not represent an automaton state.
c    -(-b^{17, 35}_2 ∧  b^{17, 35}_1 ∧  b^{17, 35}_0 ∧ true) 
c  in CNF:
c     b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ false 
c  in DIMACS:
 13070 -13071 -13072  0
c  -3 does not represent an automaton state.
c    -( b^{17, 35}_2 ∧  b^{17, 35}_1 ∧  b^{17, 35}_0 ∧ true) 
c  in CNF:
c    -b^{17, 35}_2 ∨ -b^{17, 35}_1 ∨ -b^{17, 35}_0 ∨ false 
c  in DIMACS:
-13070 -13071 -13072  0

c i = 36
c  -2+1 --> -1
c    ( b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧  p_612) -> ( b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0)
c  in CNF:
c    -b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨  b^{17, 37}_2
c    -b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_1
c    -b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨  b^{17, 37}_0
c  in DIMACS:
-13073 -13074  13075 -612  13076 0
-13073 -13074  13075 -612 -13077 0
-13073 -13074  13075 -612  13078 0

c  -1+1 --> 0
c    ( b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0 ∧  p_612) -> (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧ -b^{17, 37}_0)
c  in CNF:
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_2
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_1
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_0
c  in DIMACS:
-13073  13074 -13075 -612 -13076 0
-13073  13074 -13075 -612 -13077 0
-13073  13074 -13075 -612 -13078 0

c  0+1 --> 1
c    (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧  p_612) -> (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0)
c  in CNF:
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_2
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_1
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨  b^{17, 37}_0
c  in DIMACS:
 13073  13074  13075 -612 -13076 0
 13073  13074  13075 -612 -13077 0
 13073  13074  13075 -612  13078 0

c  1+1 --> 2
c    (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0 ∧  p_612) -> (-b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0)
c  in CNF:
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_2
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨  b^{17, 37}_1
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ -p_612 ∨ -b^{17, 37}_0
c  in DIMACS:
 13073  13074 -13075 -612 -13076 0
 13073  13074 -13075 -612  13077 0
 13073  13074 -13075 -612 -13078 0

c  2+1 --> break 
c    (-b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧  p_612) -> break
c  in CNF:
c     b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 13073 -13074  13075 -612 1162 0


c  2-1 --> 1
c    (-b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧ -p_612) -> (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0)
c  in CNF:
c     b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_2
c     b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_1
c     b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨  b^{17, 37}_0
c  in DIMACS:
 13073 -13074  13075  612 -13076 0
 13073 -13074  13075  612 -13077 0
 13073 -13074  13075  612  13078 0

c  1-1 --> 0
c    (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0 ∧ -p_612) -> (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧ -b^{17, 37}_0)
c  in CNF:
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_2
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_1
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_0
c  in DIMACS:
 13073  13074 -13075  612 -13076 0
 13073  13074 -13075  612 -13077 0
 13073  13074 -13075  612 -13078 0

c  0-1 --> -1
c    (-b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧ -p_612) -> ( b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0)
c  in CNF:
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨  b^{17, 37}_2
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_1
c     b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨  b^{17, 37}_0
c  in DIMACS:
 13073  13074  13075  612  13076 0
 13073  13074  13075  612 -13077 0
 13073  13074  13075  612  13078 0

c  -1-1 --> -2
c    ( b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧  b^{17, 36}_0 ∧ -p_612) -> ( b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0)
c  in CNF:
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨  b^{17, 37}_2
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨  b^{17, 37}_1
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨  p_612 ∨ -b^{17, 37}_0
c  in DIMACS:
-13073  13074 -13075  612  13076 0
-13073  13074 -13075  612  13077 0
-13073  13074 -13075  612 -13078 0

c  -2-1 --> break 
c    ( b^{17, 36}_2 ∧  b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨  b^{17, 36}_0 ∨  p_612 ∨ break
c  in DIMACS:
-13073 -13074  13075  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 36}_2 ∧ -b^{17, 36}_1 ∧ -b^{17, 36}_0 ∧ true) 
c  in CNF:
c    -b^{17, 36}_2 ∨  b^{17, 36}_1 ∨  b^{17, 36}_0 ∨ false 
c  in DIMACS:
-13073  13074  13075  0

c  3 does not represent an automaton state.
c    -(-b^{17, 36}_2 ∧  b^{17, 36}_1 ∧  b^{17, 36}_0 ∧ true) 
c  in CNF:
c     b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ false 
c  in DIMACS:
 13073 -13074 -13075  0
c  -3 does not represent an automaton state.
c    -( b^{17, 36}_2 ∧  b^{17, 36}_1 ∧  b^{17, 36}_0 ∧ true) 
c  in CNF:
c    -b^{17, 36}_2 ∨ -b^{17, 36}_1 ∨ -b^{17, 36}_0 ∨ false 
c  in DIMACS:
-13073 -13074 -13075  0

c i = 37
c  -2+1 --> -1
c    ( b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧  p_629) -> ( b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0)
c  in CNF:
c    -b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨  b^{17, 38}_2
c    -b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_1
c    -b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨  b^{17, 38}_0
c  in DIMACS:
-13076 -13077  13078 -629  13079 0
-13076 -13077  13078 -629 -13080 0
-13076 -13077  13078 -629  13081 0

c  -1+1 --> 0
c    ( b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0 ∧  p_629) -> (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧ -b^{17, 38}_0)
c  in CNF:
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_2
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_1
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_0
c  in DIMACS:
-13076  13077 -13078 -629 -13079 0
-13076  13077 -13078 -629 -13080 0
-13076  13077 -13078 -629 -13081 0

c  0+1 --> 1
c    (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧  p_629) -> (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0)
c  in CNF:
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_2
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_1
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨  b^{17, 38}_0
c  in DIMACS:
 13076  13077  13078 -629 -13079 0
 13076  13077  13078 -629 -13080 0
 13076  13077  13078 -629  13081 0

c  1+1 --> 2
c    (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0 ∧  p_629) -> (-b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0)
c  in CNF:
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_2
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨  b^{17, 38}_1
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ -p_629 ∨ -b^{17, 38}_0
c  in DIMACS:
 13076  13077 -13078 -629 -13079 0
 13076  13077 -13078 -629  13080 0
 13076  13077 -13078 -629 -13081 0

c  2+1 --> break 
c    (-b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧  p_629) -> break
c  in CNF:
c     b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ -p_629 ∨ break
c  in DIMACS:
 13076 -13077  13078 -629 1162 0


c  2-1 --> 1
c    (-b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧ -p_629) -> (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0)
c  in CNF:
c     b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_2
c     b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_1
c     b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨  b^{17, 38}_0
c  in DIMACS:
 13076 -13077  13078  629 -13079 0
 13076 -13077  13078  629 -13080 0
 13076 -13077  13078  629  13081 0

c  1-1 --> 0
c    (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0 ∧ -p_629) -> (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧ -b^{17, 38}_0)
c  in CNF:
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_2
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_1
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_0
c  in DIMACS:
 13076  13077 -13078  629 -13079 0
 13076  13077 -13078  629 -13080 0
 13076  13077 -13078  629 -13081 0

c  0-1 --> -1
c    (-b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧ -p_629) -> ( b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0)
c  in CNF:
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨  b^{17, 38}_2
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_1
c     b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨  b^{17, 38}_0
c  in DIMACS:
 13076  13077  13078  629  13079 0
 13076  13077  13078  629 -13080 0
 13076  13077  13078  629  13081 0

c  -1-1 --> -2
c    ( b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧  b^{17, 37}_0 ∧ -p_629) -> ( b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0)
c  in CNF:
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨  b^{17, 38}_2
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨  b^{17, 38}_1
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨  p_629 ∨ -b^{17, 38}_0
c  in DIMACS:
-13076  13077 -13078  629  13079 0
-13076  13077 -13078  629  13080 0
-13076  13077 -13078  629 -13081 0

c  -2-1 --> break 
c    ( b^{17, 37}_2 ∧  b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧ -p_629) -> break
c  in CNF:
c    -b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨  b^{17, 37}_0 ∨  p_629 ∨ break
c  in DIMACS:
-13076 -13077  13078  629 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 37}_2 ∧ -b^{17, 37}_1 ∧ -b^{17, 37}_0 ∧ true) 
c  in CNF:
c    -b^{17, 37}_2 ∨  b^{17, 37}_1 ∨  b^{17, 37}_0 ∨ false 
c  in DIMACS:
-13076  13077  13078  0

c  3 does not represent an automaton state.
c    -(-b^{17, 37}_2 ∧  b^{17, 37}_1 ∧  b^{17, 37}_0 ∧ true) 
c  in CNF:
c     b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ false 
c  in DIMACS:
 13076 -13077 -13078  0
c  -3 does not represent an automaton state.
c    -( b^{17, 37}_2 ∧  b^{17, 37}_1 ∧  b^{17, 37}_0 ∧ true) 
c  in CNF:
c    -b^{17, 37}_2 ∨ -b^{17, 37}_1 ∨ -b^{17, 37}_0 ∨ false 
c  in DIMACS:
-13076 -13077 -13078  0

c i = 38
c  -2+1 --> -1
c    ( b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧  p_646) -> ( b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0)
c  in CNF:
c    -b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨  b^{17, 39}_2
c    -b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_1
c    -b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨  b^{17, 39}_0
c  in DIMACS:
-13079 -13080  13081 -646  13082 0
-13079 -13080  13081 -646 -13083 0
-13079 -13080  13081 -646  13084 0

c  -1+1 --> 0
c    ( b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0 ∧  p_646) -> (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧ -b^{17, 39}_0)
c  in CNF:
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_2
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_1
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_0
c  in DIMACS:
-13079  13080 -13081 -646 -13082 0
-13079  13080 -13081 -646 -13083 0
-13079  13080 -13081 -646 -13084 0

c  0+1 --> 1
c    (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧  p_646) -> (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0)
c  in CNF:
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_2
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_1
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨  b^{17, 39}_0
c  in DIMACS:
 13079  13080  13081 -646 -13082 0
 13079  13080  13081 -646 -13083 0
 13079  13080  13081 -646  13084 0

c  1+1 --> 2
c    (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0 ∧  p_646) -> (-b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0)
c  in CNF:
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_2
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨  b^{17, 39}_1
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ -p_646 ∨ -b^{17, 39}_0
c  in DIMACS:
 13079  13080 -13081 -646 -13082 0
 13079  13080 -13081 -646  13083 0
 13079  13080 -13081 -646 -13084 0

c  2+1 --> break 
c    (-b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧  p_646) -> break
c  in CNF:
c     b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 13079 -13080  13081 -646 1162 0


c  2-1 --> 1
c    (-b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧ -p_646) -> (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0)
c  in CNF:
c     b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_2
c     b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_1
c     b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨  b^{17, 39}_0
c  in DIMACS:
 13079 -13080  13081  646 -13082 0
 13079 -13080  13081  646 -13083 0
 13079 -13080  13081  646  13084 0

c  1-1 --> 0
c    (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0 ∧ -p_646) -> (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧ -b^{17, 39}_0)
c  in CNF:
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_2
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_1
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_0
c  in DIMACS:
 13079  13080 -13081  646 -13082 0
 13079  13080 -13081  646 -13083 0
 13079  13080 -13081  646 -13084 0

c  0-1 --> -1
c    (-b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧ -p_646) -> ( b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0)
c  in CNF:
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨  b^{17, 39}_2
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_1
c     b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨  b^{17, 39}_0
c  in DIMACS:
 13079  13080  13081  646  13082 0
 13079  13080  13081  646 -13083 0
 13079  13080  13081  646  13084 0

c  -1-1 --> -2
c    ( b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧  b^{17, 38}_0 ∧ -p_646) -> ( b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0)
c  in CNF:
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨  b^{17, 39}_2
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨  b^{17, 39}_1
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨  p_646 ∨ -b^{17, 39}_0
c  in DIMACS:
-13079  13080 -13081  646  13082 0
-13079  13080 -13081  646  13083 0
-13079  13080 -13081  646 -13084 0

c  -2-1 --> break 
c    ( b^{17, 38}_2 ∧  b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨  b^{17, 38}_0 ∨  p_646 ∨ break
c  in DIMACS:
-13079 -13080  13081  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 38}_2 ∧ -b^{17, 38}_1 ∧ -b^{17, 38}_0 ∧ true) 
c  in CNF:
c    -b^{17, 38}_2 ∨  b^{17, 38}_1 ∨  b^{17, 38}_0 ∨ false 
c  in DIMACS:
-13079  13080  13081  0

c  3 does not represent an automaton state.
c    -(-b^{17, 38}_2 ∧  b^{17, 38}_1 ∧  b^{17, 38}_0 ∧ true) 
c  in CNF:
c     b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ false 
c  in DIMACS:
 13079 -13080 -13081  0
c  -3 does not represent an automaton state.
c    -( b^{17, 38}_2 ∧  b^{17, 38}_1 ∧  b^{17, 38}_0 ∧ true) 
c  in CNF:
c    -b^{17, 38}_2 ∨ -b^{17, 38}_1 ∨ -b^{17, 38}_0 ∨ false 
c  in DIMACS:
-13079 -13080 -13081  0

c i = 39
c  -2+1 --> -1
c    ( b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧  p_663) -> ( b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0)
c  in CNF:
c    -b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨  b^{17, 40}_2
c    -b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_1
c    -b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨  b^{17, 40}_0
c  in DIMACS:
-13082 -13083  13084 -663  13085 0
-13082 -13083  13084 -663 -13086 0
-13082 -13083  13084 -663  13087 0

c  -1+1 --> 0
c    ( b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0 ∧  p_663) -> (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧ -b^{17, 40}_0)
c  in CNF:
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_2
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_1
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_0
c  in DIMACS:
-13082  13083 -13084 -663 -13085 0
-13082  13083 -13084 -663 -13086 0
-13082  13083 -13084 -663 -13087 0

c  0+1 --> 1
c    (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧  p_663) -> (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0)
c  in CNF:
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_2
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_1
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨  b^{17, 40}_0
c  in DIMACS:
 13082  13083  13084 -663 -13085 0
 13082  13083  13084 -663 -13086 0
 13082  13083  13084 -663  13087 0

c  1+1 --> 2
c    (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0 ∧  p_663) -> (-b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0)
c  in CNF:
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_2
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨  b^{17, 40}_1
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ -p_663 ∨ -b^{17, 40}_0
c  in DIMACS:
 13082  13083 -13084 -663 -13085 0
 13082  13083 -13084 -663  13086 0
 13082  13083 -13084 -663 -13087 0

c  2+1 --> break 
c    (-b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧  p_663) -> break
c  in CNF:
c     b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 13082 -13083  13084 -663 1162 0


c  2-1 --> 1
c    (-b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧ -p_663) -> (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0)
c  in CNF:
c     b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_2
c     b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_1
c     b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨  b^{17, 40}_0
c  in DIMACS:
 13082 -13083  13084  663 -13085 0
 13082 -13083  13084  663 -13086 0
 13082 -13083  13084  663  13087 0

c  1-1 --> 0
c    (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0 ∧ -p_663) -> (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧ -b^{17, 40}_0)
c  in CNF:
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_2
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_1
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_0
c  in DIMACS:
 13082  13083 -13084  663 -13085 0
 13082  13083 -13084  663 -13086 0
 13082  13083 -13084  663 -13087 0

c  0-1 --> -1
c    (-b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧ -p_663) -> ( b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0)
c  in CNF:
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨  b^{17, 40}_2
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_1
c     b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨  b^{17, 40}_0
c  in DIMACS:
 13082  13083  13084  663  13085 0
 13082  13083  13084  663 -13086 0
 13082  13083  13084  663  13087 0

c  -1-1 --> -2
c    ( b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧  b^{17, 39}_0 ∧ -p_663) -> ( b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0)
c  in CNF:
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨  b^{17, 40}_2
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨  b^{17, 40}_1
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨  p_663 ∨ -b^{17, 40}_0
c  in DIMACS:
-13082  13083 -13084  663  13085 0
-13082  13083 -13084  663  13086 0
-13082  13083 -13084  663 -13087 0

c  -2-1 --> break 
c    ( b^{17, 39}_2 ∧  b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨  b^{17, 39}_0 ∨  p_663 ∨ break
c  in DIMACS:
-13082 -13083  13084  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 39}_2 ∧ -b^{17, 39}_1 ∧ -b^{17, 39}_0 ∧ true) 
c  in CNF:
c    -b^{17, 39}_2 ∨  b^{17, 39}_1 ∨  b^{17, 39}_0 ∨ false 
c  in DIMACS:
-13082  13083  13084  0

c  3 does not represent an automaton state.
c    -(-b^{17, 39}_2 ∧  b^{17, 39}_1 ∧  b^{17, 39}_0 ∧ true) 
c  in CNF:
c     b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ false 
c  in DIMACS:
 13082 -13083 -13084  0
c  -3 does not represent an automaton state.
c    -( b^{17, 39}_2 ∧  b^{17, 39}_1 ∧  b^{17, 39}_0 ∧ true) 
c  in CNF:
c    -b^{17, 39}_2 ∨ -b^{17, 39}_1 ∨ -b^{17, 39}_0 ∨ false 
c  in DIMACS:
-13082 -13083 -13084  0

c i = 40
c  -2+1 --> -1
c    ( b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧  p_680) -> ( b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0)
c  in CNF:
c    -b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨  b^{17, 41}_2
c    -b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_1
c    -b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨  b^{17, 41}_0
c  in DIMACS:
-13085 -13086  13087 -680  13088 0
-13085 -13086  13087 -680 -13089 0
-13085 -13086  13087 -680  13090 0

c  -1+1 --> 0
c    ( b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0 ∧  p_680) -> (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧ -b^{17, 41}_0)
c  in CNF:
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_2
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_1
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_0
c  in DIMACS:
-13085  13086 -13087 -680 -13088 0
-13085  13086 -13087 -680 -13089 0
-13085  13086 -13087 -680 -13090 0

c  0+1 --> 1
c    (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧  p_680) -> (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0)
c  in CNF:
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_2
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_1
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨  b^{17, 41}_0
c  in DIMACS:
 13085  13086  13087 -680 -13088 0
 13085  13086  13087 -680 -13089 0
 13085  13086  13087 -680  13090 0

c  1+1 --> 2
c    (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0 ∧  p_680) -> (-b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0)
c  in CNF:
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_2
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨  b^{17, 41}_1
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ -p_680 ∨ -b^{17, 41}_0
c  in DIMACS:
 13085  13086 -13087 -680 -13088 0
 13085  13086 -13087 -680  13089 0
 13085  13086 -13087 -680 -13090 0

c  2+1 --> break 
c    (-b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧  p_680) -> break
c  in CNF:
c     b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 13085 -13086  13087 -680 1162 0


c  2-1 --> 1
c    (-b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧ -p_680) -> (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0)
c  in CNF:
c     b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_2
c     b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_1
c     b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨  b^{17, 41}_0
c  in DIMACS:
 13085 -13086  13087  680 -13088 0
 13085 -13086  13087  680 -13089 0
 13085 -13086  13087  680  13090 0

c  1-1 --> 0
c    (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0 ∧ -p_680) -> (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧ -b^{17, 41}_0)
c  in CNF:
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_2
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_1
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_0
c  in DIMACS:
 13085  13086 -13087  680 -13088 0
 13085  13086 -13087  680 -13089 0
 13085  13086 -13087  680 -13090 0

c  0-1 --> -1
c    (-b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧ -p_680) -> ( b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0)
c  in CNF:
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨  b^{17, 41}_2
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_1
c     b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨  b^{17, 41}_0
c  in DIMACS:
 13085  13086  13087  680  13088 0
 13085  13086  13087  680 -13089 0
 13085  13086  13087  680  13090 0

c  -1-1 --> -2
c    ( b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧  b^{17, 40}_0 ∧ -p_680) -> ( b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0)
c  in CNF:
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨  b^{17, 41}_2
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨  b^{17, 41}_1
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨  p_680 ∨ -b^{17, 41}_0
c  in DIMACS:
-13085  13086 -13087  680  13088 0
-13085  13086 -13087  680  13089 0
-13085  13086 -13087  680 -13090 0

c  -2-1 --> break 
c    ( b^{17, 40}_2 ∧  b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨  b^{17, 40}_0 ∨  p_680 ∨ break
c  in DIMACS:
-13085 -13086  13087  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 40}_2 ∧ -b^{17, 40}_1 ∧ -b^{17, 40}_0 ∧ true) 
c  in CNF:
c    -b^{17, 40}_2 ∨  b^{17, 40}_1 ∨  b^{17, 40}_0 ∨ false 
c  in DIMACS:
-13085  13086  13087  0

c  3 does not represent an automaton state.
c    -(-b^{17, 40}_2 ∧  b^{17, 40}_1 ∧  b^{17, 40}_0 ∧ true) 
c  in CNF:
c     b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ false 
c  in DIMACS:
 13085 -13086 -13087  0
c  -3 does not represent an automaton state.
c    -( b^{17, 40}_2 ∧  b^{17, 40}_1 ∧  b^{17, 40}_0 ∧ true) 
c  in CNF:
c    -b^{17, 40}_2 ∨ -b^{17, 40}_1 ∨ -b^{17, 40}_0 ∨ false 
c  in DIMACS:
-13085 -13086 -13087  0

c i = 41
c  -2+1 --> -1
c    ( b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧  p_697) -> ( b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0)
c  in CNF:
c    -b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨  b^{17, 42}_2
c    -b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_1
c    -b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨  b^{17, 42}_0
c  in DIMACS:
-13088 -13089  13090 -697  13091 0
-13088 -13089  13090 -697 -13092 0
-13088 -13089  13090 -697  13093 0

c  -1+1 --> 0
c    ( b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0 ∧  p_697) -> (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧ -b^{17, 42}_0)
c  in CNF:
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_2
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_1
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_0
c  in DIMACS:
-13088  13089 -13090 -697 -13091 0
-13088  13089 -13090 -697 -13092 0
-13088  13089 -13090 -697 -13093 0

c  0+1 --> 1
c    (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧  p_697) -> (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0)
c  in CNF:
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_2
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_1
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨  b^{17, 42}_0
c  in DIMACS:
 13088  13089  13090 -697 -13091 0
 13088  13089  13090 -697 -13092 0
 13088  13089  13090 -697  13093 0

c  1+1 --> 2
c    (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0 ∧  p_697) -> (-b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0)
c  in CNF:
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_2
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨  b^{17, 42}_1
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ -p_697 ∨ -b^{17, 42}_0
c  in DIMACS:
 13088  13089 -13090 -697 -13091 0
 13088  13089 -13090 -697  13092 0
 13088  13089 -13090 -697 -13093 0

c  2+1 --> break 
c    (-b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧  p_697) -> break
c  in CNF:
c     b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ -p_697 ∨ break
c  in DIMACS:
 13088 -13089  13090 -697 1162 0


c  2-1 --> 1
c    (-b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧ -p_697) -> (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0)
c  in CNF:
c     b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_2
c     b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_1
c     b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨  b^{17, 42}_0
c  in DIMACS:
 13088 -13089  13090  697 -13091 0
 13088 -13089  13090  697 -13092 0
 13088 -13089  13090  697  13093 0

c  1-1 --> 0
c    (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0 ∧ -p_697) -> (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧ -b^{17, 42}_0)
c  in CNF:
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_2
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_1
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_0
c  in DIMACS:
 13088  13089 -13090  697 -13091 0
 13088  13089 -13090  697 -13092 0
 13088  13089 -13090  697 -13093 0

c  0-1 --> -1
c    (-b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧ -p_697) -> ( b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0)
c  in CNF:
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨  b^{17, 42}_2
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_1
c     b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨  b^{17, 42}_0
c  in DIMACS:
 13088  13089  13090  697  13091 0
 13088  13089  13090  697 -13092 0
 13088  13089  13090  697  13093 0

c  -1-1 --> -2
c    ( b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧  b^{17, 41}_0 ∧ -p_697) -> ( b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0)
c  in CNF:
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨  b^{17, 42}_2
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨  b^{17, 42}_1
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨  p_697 ∨ -b^{17, 42}_0
c  in DIMACS:
-13088  13089 -13090  697  13091 0
-13088  13089 -13090  697  13092 0
-13088  13089 -13090  697 -13093 0

c  -2-1 --> break 
c    ( b^{17, 41}_2 ∧  b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧ -p_697) -> break
c  in CNF:
c    -b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨  b^{17, 41}_0 ∨  p_697 ∨ break
c  in DIMACS:
-13088 -13089  13090  697 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 41}_2 ∧ -b^{17, 41}_1 ∧ -b^{17, 41}_0 ∧ true) 
c  in CNF:
c    -b^{17, 41}_2 ∨  b^{17, 41}_1 ∨  b^{17, 41}_0 ∨ false 
c  in DIMACS:
-13088  13089  13090  0

c  3 does not represent an automaton state.
c    -(-b^{17, 41}_2 ∧  b^{17, 41}_1 ∧  b^{17, 41}_0 ∧ true) 
c  in CNF:
c     b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ false 
c  in DIMACS:
 13088 -13089 -13090  0
c  -3 does not represent an automaton state.
c    -( b^{17, 41}_2 ∧  b^{17, 41}_1 ∧  b^{17, 41}_0 ∧ true) 
c  in CNF:
c    -b^{17, 41}_2 ∨ -b^{17, 41}_1 ∨ -b^{17, 41}_0 ∨ false 
c  in DIMACS:
-13088 -13089 -13090  0

c i = 42
c  -2+1 --> -1
c    ( b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧  p_714) -> ( b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0)
c  in CNF:
c    -b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨  b^{17, 43}_2
c    -b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_1
c    -b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨  b^{17, 43}_0
c  in DIMACS:
-13091 -13092  13093 -714  13094 0
-13091 -13092  13093 -714 -13095 0
-13091 -13092  13093 -714  13096 0

c  -1+1 --> 0
c    ( b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0 ∧  p_714) -> (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧ -b^{17, 43}_0)
c  in CNF:
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_2
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_1
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_0
c  in DIMACS:
-13091  13092 -13093 -714 -13094 0
-13091  13092 -13093 -714 -13095 0
-13091  13092 -13093 -714 -13096 0

c  0+1 --> 1
c    (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧  p_714) -> (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0)
c  in CNF:
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_2
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_1
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨  b^{17, 43}_0
c  in DIMACS:
 13091  13092  13093 -714 -13094 0
 13091  13092  13093 -714 -13095 0
 13091  13092  13093 -714  13096 0

c  1+1 --> 2
c    (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0 ∧  p_714) -> (-b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0)
c  in CNF:
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_2
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨  b^{17, 43}_1
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ -p_714 ∨ -b^{17, 43}_0
c  in DIMACS:
 13091  13092 -13093 -714 -13094 0
 13091  13092 -13093 -714  13095 0
 13091  13092 -13093 -714 -13096 0

c  2+1 --> break 
c    (-b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧  p_714) -> break
c  in CNF:
c     b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 13091 -13092  13093 -714 1162 0


c  2-1 --> 1
c    (-b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧ -p_714) -> (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0)
c  in CNF:
c     b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_2
c     b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_1
c     b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨  b^{17, 43}_0
c  in DIMACS:
 13091 -13092  13093  714 -13094 0
 13091 -13092  13093  714 -13095 0
 13091 -13092  13093  714  13096 0

c  1-1 --> 0
c    (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0 ∧ -p_714) -> (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧ -b^{17, 43}_0)
c  in CNF:
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_2
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_1
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_0
c  in DIMACS:
 13091  13092 -13093  714 -13094 0
 13091  13092 -13093  714 -13095 0
 13091  13092 -13093  714 -13096 0

c  0-1 --> -1
c    (-b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧ -p_714) -> ( b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0)
c  in CNF:
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨  b^{17, 43}_2
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_1
c     b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨  b^{17, 43}_0
c  in DIMACS:
 13091  13092  13093  714  13094 0
 13091  13092  13093  714 -13095 0
 13091  13092  13093  714  13096 0

c  -1-1 --> -2
c    ( b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧  b^{17, 42}_0 ∧ -p_714) -> ( b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0)
c  in CNF:
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨  b^{17, 43}_2
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨  b^{17, 43}_1
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨  p_714 ∨ -b^{17, 43}_0
c  in DIMACS:
-13091  13092 -13093  714  13094 0
-13091  13092 -13093  714  13095 0
-13091  13092 -13093  714 -13096 0

c  -2-1 --> break 
c    ( b^{17, 42}_2 ∧  b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨  b^{17, 42}_0 ∨  p_714 ∨ break
c  in DIMACS:
-13091 -13092  13093  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 42}_2 ∧ -b^{17, 42}_1 ∧ -b^{17, 42}_0 ∧ true) 
c  in CNF:
c    -b^{17, 42}_2 ∨  b^{17, 42}_1 ∨  b^{17, 42}_0 ∨ false 
c  in DIMACS:
-13091  13092  13093  0

c  3 does not represent an automaton state.
c    -(-b^{17, 42}_2 ∧  b^{17, 42}_1 ∧  b^{17, 42}_0 ∧ true) 
c  in CNF:
c     b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ false 
c  in DIMACS:
 13091 -13092 -13093  0
c  -3 does not represent an automaton state.
c    -( b^{17, 42}_2 ∧  b^{17, 42}_1 ∧  b^{17, 42}_0 ∧ true) 
c  in CNF:
c    -b^{17, 42}_2 ∨ -b^{17, 42}_1 ∨ -b^{17, 42}_0 ∨ false 
c  in DIMACS:
-13091 -13092 -13093  0

c i = 43
c  -2+1 --> -1
c    ( b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧  p_731) -> ( b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0)
c  in CNF:
c    -b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨  b^{17, 44}_2
c    -b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_1
c    -b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨  b^{17, 44}_0
c  in DIMACS:
-13094 -13095  13096 -731  13097 0
-13094 -13095  13096 -731 -13098 0
-13094 -13095  13096 -731  13099 0

c  -1+1 --> 0
c    ( b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0 ∧  p_731) -> (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧ -b^{17, 44}_0)
c  in CNF:
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_2
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_1
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_0
c  in DIMACS:
-13094  13095 -13096 -731 -13097 0
-13094  13095 -13096 -731 -13098 0
-13094  13095 -13096 -731 -13099 0

c  0+1 --> 1
c    (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧  p_731) -> (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0)
c  in CNF:
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_2
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_1
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨  b^{17, 44}_0
c  in DIMACS:
 13094  13095  13096 -731 -13097 0
 13094  13095  13096 -731 -13098 0
 13094  13095  13096 -731  13099 0

c  1+1 --> 2
c    (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0 ∧  p_731) -> (-b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0)
c  in CNF:
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_2
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨  b^{17, 44}_1
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ -p_731 ∨ -b^{17, 44}_0
c  in DIMACS:
 13094  13095 -13096 -731 -13097 0
 13094  13095 -13096 -731  13098 0
 13094  13095 -13096 -731 -13099 0

c  2+1 --> break 
c    (-b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧  p_731) -> break
c  in CNF:
c     b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ -p_731 ∨ break
c  in DIMACS:
 13094 -13095  13096 -731 1162 0


c  2-1 --> 1
c    (-b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧ -p_731) -> (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0)
c  in CNF:
c     b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_2
c     b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_1
c     b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨  b^{17, 44}_0
c  in DIMACS:
 13094 -13095  13096  731 -13097 0
 13094 -13095  13096  731 -13098 0
 13094 -13095  13096  731  13099 0

c  1-1 --> 0
c    (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0 ∧ -p_731) -> (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧ -b^{17, 44}_0)
c  in CNF:
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_2
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_1
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_0
c  in DIMACS:
 13094  13095 -13096  731 -13097 0
 13094  13095 -13096  731 -13098 0
 13094  13095 -13096  731 -13099 0

c  0-1 --> -1
c    (-b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧ -p_731) -> ( b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0)
c  in CNF:
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨  b^{17, 44}_2
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_1
c     b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨  b^{17, 44}_0
c  in DIMACS:
 13094  13095  13096  731  13097 0
 13094  13095  13096  731 -13098 0
 13094  13095  13096  731  13099 0

c  -1-1 --> -2
c    ( b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧  b^{17, 43}_0 ∧ -p_731) -> ( b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0)
c  in CNF:
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨  b^{17, 44}_2
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨  b^{17, 44}_1
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨  p_731 ∨ -b^{17, 44}_0
c  in DIMACS:
-13094  13095 -13096  731  13097 0
-13094  13095 -13096  731  13098 0
-13094  13095 -13096  731 -13099 0

c  -2-1 --> break 
c    ( b^{17, 43}_2 ∧  b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧ -p_731) -> break
c  in CNF:
c    -b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨  b^{17, 43}_0 ∨  p_731 ∨ break
c  in DIMACS:
-13094 -13095  13096  731 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 43}_2 ∧ -b^{17, 43}_1 ∧ -b^{17, 43}_0 ∧ true) 
c  in CNF:
c    -b^{17, 43}_2 ∨  b^{17, 43}_1 ∨  b^{17, 43}_0 ∨ false 
c  in DIMACS:
-13094  13095  13096  0

c  3 does not represent an automaton state.
c    -(-b^{17, 43}_2 ∧  b^{17, 43}_1 ∧  b^{17, 43}_0 ∧ true) 
c  in CNF:
c     b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ false 
c  in DIMACS:
 13094 -13095 -13096  0
c  -3 does not represent an automaton state.
c    -( b^{17, 43}_2 ∧  b^{17, 43}_1 ∧  b^{17, 43}_0 ∧ true) 
c  in CNF:
c    -b^{17, 43}_2 ∨ -b^{17, 43}_1 ∨ -b^{17, 43}_0 ∨ false 
c  in DIMACS:
-13094 -13095 -13096  0

c i = 44
c  -2+1 --> -1
c    ( b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧  p_748) -> ( b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0)
c  in CNF:
c    -b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨  b^{17, 45}_2
c    -b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_1
c    -b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨  b^{17, 45}_0
c  in DIMACS:
-13097 -13098  13099 -748  13100 0
-13097 -13098  13099 -748 -13101 0
-13097 -13098  13099 -748  13102 0

c  -1+1 --> 0
c    ( b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0 ∧  p_748) -> (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧ -b^{17, 45}_0)
c  in CNF:
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_2
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_1
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_0
c  in DIMACS:
-13097  13098 -13099 -748 -13100 0
-13097  13098 -13099 -748 -13101 0
-13097  13098 -13099 -748 -13102 0

c  0+1 --> 1
c    (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧  p_748) -> (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0)
c  in CNF:
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_2
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_1
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨  b^{17, 45}_0
c  in DIMACS:
 13097  13098  13099 -748 -13100 0
 13097  13098  13099 -748 -13101 0
 13097  13098  13099 -748  13102 0

c  1+1 --> 2
c    (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0 ∧  p_748) -> (-b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0)
c  in CNF:
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_2
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨  b^{17, 45}_1
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ -p_748 ∨ -b^{17, 45}_0
c  in DIMACS:
 13097  13098 -13099 -748 -13100 0
 13097  13098 -13099 -748  13101 0
 13097  13098 -13099 -748 -13102 0

c  2+1 --> break 
c    (-b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧  p_748) -> break
c  in CNF:
c     b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 13097 -13098  13099 -748 1162 0


c  2-1 --> 1
c    (-b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧ -p_748) -> (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0)
c  in CNF:
c     b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_2
c     b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_1
c     b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨  b^{17, 45}_0
c  in DIMACS:
 13097 -13098  13099  748 -13100 0
 13097 -13098  13099  748 -13101 0
 13097 -13098  13099  748  13102 0

c  1-1 --> 0
c    (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0 ∧ -p_748) -> (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧ -b^{17, 45}_0)
c  in CNF:
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_2
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_1
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_0
c  in DIMACS:
 13097  13098 -13099  748 -13100 0
 13097  13098 -13099  748 -13101 0
 13097  13098 -13099  748 -13102 0

c  0-1 --> -1
c    (-b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧ -p_748) -> ( b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0)
c  in CNF:
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨  b^{17, 45}_2
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_1
c     b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨  b^{17, 45}_0
c  in DIMACS:
 13097  13098  13099  748  13100 0
 13097  13098  13099  748 -13101 0
 13097  13098  13099  748  13102 0

c  -1-1 --> -2
c    ( b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧  b^{17, 44}_0 ∧ -p_748) -> ( b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0)
c  in CNF:
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨  b^{17, 45}_2
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨  b^{17, 45}_1
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨  p_748 ∨ -b^{17, 45}_0
c  in DIMACS:
-13097  13098 -13099  748  13100 0
-13097  13098 -13099  748  13101 0
-13097  13098 -13099  748 -13102 0

c  -2-1 --> break 
c    ( b^{17, 44}_2 ∧  b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨  b^{17, 44}_0 ∨  p_748 ∨ break
c  in DIMACS:
-13097 -13098  13099  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 44}_2 ∧ -b^{17, 44}_1 ∧ -b^{17, 44}_0 ∧ true) 
c  in CNF:
c    -b^{17, 44}_2 ∨  b^{17, 44}_1 ∨  b^{17, 44}_0 ∨ false 
c  in DIMACS:
-13097  13098  13099  0

c  3 does not represent an automaton state.
c    -(-b^{17, 44}_2 ∧  b^{17, 44}_1 ∧  b^{17, 44}_0 ∧ true) 
c  in CNF:
c     b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ false 
c  in DIMACS:
 13097 -13098 -13099  0
c  -3 does not represent an automaton state.
c    -( b^{17, 44}_2 ∧  b^{17, 44}_1 ∧  b^{17, 44}_0 ∧ true) 
c  in CNF:
c    -b^{17, 44}_2 ∨ -b^{17, 44}_1 ∨ -b^{17, 44}_0 ∨ false 
c  in DIMACS:
-13097 -13098 -13099  0

c i = 45
c  -2+1 --> -1
c    ( b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧  p_765) -> ( b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0)
c  in CNF:
c    -b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨  b^{17, 46}_2
c    -b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_1
c    -b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨  b^{17, 46}_0
c  in DIMACS:
-13100 -13101  13102 -765  13103 0
-13100 -13101  13102 -765 -13104 0
-13100 -13101  13102 -765  13105 0

c  -1+1 --> 0
c    ( b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0 ∧  p_765) -> (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧ -b^{17, 46}_0)
c  in CNF:
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_2
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_1
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_0
c  in DIMACS:
-13100  13101 -13102 -765 -13103 0
-13100  13101 -13102 -765 -13104 0
-13100  13101 -13102 -765 -13105 0

c  0+1 --> 1
c    (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧  p_765) -> (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0)
c  in CNF:
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_2
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_1
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨  b^{17, 46}_0
c  in DIMACS:
 13100  13101  13102 -765 -13103 0
 13100  13101  13102 -765 -13104 0
 13100  13101  13102 -765  13105 0

c  1+1 --> 2
c    (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0 ∧  p_765) -> (-b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0)
c  in CNF:
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_2
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨  b^{17, 46}_1
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ -p_765 ∨ -b^{17, 46}_0
c  in DIMACS:
 13100  13101 -13102 -765 -13103 0
 13100  13101 -13102 -765  13104 0
 13100  13101 -13102 -765 -13105 0

c  2+1 --> break 
c    (-b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧  p_765) -> break
c  in CNF:
c     b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 13100 -13101  13102 -765 1162 0


c  2-1 --> 1
c    (-b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧ -p_765) -> (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0)
c  in CNF:
c     b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_2
c     b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_1
c     b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨  b^{17, 46}_0
c  in DIMACS:
 13100 -13101  13102  765 -13103 0
 13100 -13101  13102  765 -13104 0
 13100 -13101  13102  765  13105 0

c  1-1 --> 0
c    (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0 ∧ -p_765) -> (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧ -b^{17, 46}_0)
c  in CNF:
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_2
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_1
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_0
c  in DIMACS:
 13100  13101 -13102  765 -13103 0
 13100  13101 -13102  765 -13104 0
 13100  13101 -13102  765 -13105 0

c  0-1 --> -1
c    (-b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧ -p_765) -> ( b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0)
c  in CNF:
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨  b^{17, 46}_2
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_1
c     b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨  b^{17, 46}_0
c  in DIMACS:
 13100  13101  13102  765  13103 0
 13100  13101  13102  765 -13104 0
 13100  13101  13102  765  13105 0

c  -1-1 --> -2
c    ( b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧  b^{17, 45}_0 ∧ -p_765) -> ( b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0)
c  in CNF:
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨  b^{17, 46}_2
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨  b^{17, 46}_1
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨  p_765 ∨ -b^{17, 46}_0
c  in DIMACS:
-13100  13101 -13102  765  13103 0
-13100  13101 -13102  765  13104 0
-13100  13101 -13102  765 -13105 0

c  -2-1 --> break 
c    ( b^{17, 45}_2 ∧  b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨  b^{17, 45}_0 ∨  p_765 ∨ break
c  in DIMACS:
-13100 -13101  13102  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 45}_2 ∧ -b^{17, 45}_1 ∧ -b^{17, 45}_0 ∧ true) 
c  in CNF:
c    -b^{17, 45}_2 ∨  b^{17, 45}_1 ∨  b^{17, 45}_0 ∨ false 
c  in DIMACS:
-13100  13101  13102  0

c  3 does not represent an automaton state.
c    -(-b^{17, 45}_2 ∧  b^{17, 45}_1 ∧  b^{17, 45}_0 ∧ true) 
c  in CNF:
c     b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ false 
c  in DIMACS:
 13100 -13101 -13102  0
c  -3 does not represent an automaton state.
c    -( b^{17, 45}_2 ∧  b^{17, 45}_1 ∧  b^{17, 45}_0 ∧ true) 
c  in CNF:
c    -b^{17, 45}_2 ∨ -b^{17, 45}_1 ∨ -b^{17, 45}_0 ∨ false 
c  in DIMACS:
-13100 -13101 -13102  0

c i = 46
c  -2+1 --> -1
c    ( b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧  p_782) -> ( b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0)
c  in CNF:
c    -b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨  b^{17, 47}_2
c    -b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_1
c    -b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨  b^{17, 47}_0
c  in DIMACS:
-13103 -13104  13105 -782  13106 0
-13103 -13104  13105 -782 -13107 0
-13103 -13104  13105 -782  13108 0

c  -1+1 --> 0
c    ( b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0 ∧  p_782) -> (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧ -b^{17, 47}_0)
c  in CNF:
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_2
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_1
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_0
c  in DIMACS:
-13103  13104 -13105 -782 -13106 0
-13103  13104 -13105 -782 -13107 0
-13103  13104 -13105 -782 -13108 0

c  0+1 --> 1
c    (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧  p_782) -> (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0)
c  in CNF:
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_2
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_1
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨  b^{17, 47}_0
c  in DIMACS:
 13103  13104  13105 -782 -13106 0
 13103  13104  13105 -782 -13107 0
 13103  13104  13105 -782  13108 0

c  1+1 --> 2
c    (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0 ∧  p_782) -> (-b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0)
c  in CNF:
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_2
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨  b^{17, 47}_1
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ -p_782 ∨ -b^{17, 47}_0
c  in DIMACS:
 13103  13104 -13105 -782 -13106 0
 13103  13104 -13105 -782  13107 0
 13103  13104 -13105 -782 -13108 0

c  2+1 --> break 
c    (-b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧  p_782) -> break
c  in CNF:
c     b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 13103 -13104  13105 -782 1162 0


c  2-1 --> 1
c    (-b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧ -p_782) -> (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0)
c  in CNF:
c     b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_2
c     b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_1
c     b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨  b^{17, 47}_0
c  in DIMACS:
 13103 -13104  13105  782 -13106 0
 13103 -13104  13105  782 -13107 0
 13103 -13104  13105  782  13108 0

c  1-1 --> 0
c    (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0 ∧ -p_782) -> (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧ -b^{17, 47}_0)
c  in CNF:
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_2
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_1
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_0
c  in DIMACS:
 13103  13104 -13105  782 -13106 0
 13103  13104 -13105  782 -13107 0
 13103  13104 -13105  782 -13108 0

c  0-1 --> -1
c    (-b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧ -p_782) -> ( b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0)
c  in CNF:
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨  b^{17, 47}_2
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_1
c     b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨  b^{17, 47}_0
c  in DIMACS:
 13103  13104  13105  782  13106 0
 13103  13104  13105  782 -13107 0
 13103  13104  13105  782  13108 0

c  -1-1 --> -2
c    ( b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧  b^{17, 46}_0 ∧ -p_782) -> ( b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0)
c  in CNF:
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨  b^{17, 47}_2
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨  b^{17, 47}_1
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨  p_782 ∨ -b^{17, 47}_0
c  in DIMACS:
-13103  13104 -13105  782  13106 0
-13103  13104 -13105  782  13107 0
-13103  13104 -13105  782 -13108 0

c  -2-1 --> break 
c    ( b^{17, 46}_2 ∧  b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨  b^{17, 46}_0 ∨  p_782 ∨ break
c  in DIMACS:
-13103 -13104  13105  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 46}_2 ∧ -b^{17, 46}_1 ∧ -b^{17, 46}_0 ∧ true) 
c  in CNF:
c    -b^{17, 46}_2 ∨  b^{17, 46}_1 ∨  b^{17, 46}_0 ∨ false 
c  in DIMACS:
-13103  13104  13105  0

c  3 does not represent an automaton state.
c    -(-b^{17, 46}_2 ∧  b^{17, 46}_1 ∧  b^{17, 46}_0 ∧ true) 
c  in CNF:
c     b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ false 
c  in DIMACS:
 13103 -13104 -13105  0
c  -3 does not represent an automaton state.
c    -( b^{17, 46}_2 ∧  b^{17, 46}_1 ∧  b^{17, 46}_0 ∧ true) 
c  in CNF:
c    -b^{17, 46}_2 ∨ -b^{17, 46}_1 ∨ -b^{17, 46}_0 ∨ false 
c  in DIMACS:
-13103 -13104 -13105  0

c i = 47
c  -2+1 --> -1
c    ( b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧  p_799) -> ( b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0)
c  in CNF:
c    -b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨  b^{17, 48}_2
c    -b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_1
c    -b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨  b^{17, 48}_0
c  in DIMACS:
-13106 -13107  13108 -799  13109 0
-13106 -13107  13108 -799 -13110 0
-13106 -13107  13108 -799  13111 0

c  -1+1 --> 0
c    ( b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0 ∧  p_799) -> (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧ -b^{17, 48}_0)
c  in CNF:
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_2
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_1
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_0
c  in DIMACS:
-13106  13107 -13108 -799 -13109 0
-13106  13107 -13108 -799 -13110 0
-13106  13107 -13108 -799 -13111 0

c  0+1 --> 1
c    (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧  p_799) -> (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0)
c  in CNF:
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_2
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_1
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨  b^{17, 48}_0
c  in DIMACS:
 13106  13107  13108 -799 -13109 0
 13106  13107  13108 -799 -13110 0
 13106  13107  13108 -799  13111 0

c  1+1 --> 2
c    (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0 ∧  p_799) -> (-b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0)
c  in CNF:
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_2
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨  b^{17, 48}_1
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ -p_799 ∨ -b^{17, 48}_0
c  in DIMACS:
 13106  13107 -13108 -799 -13109 0
 13106  13107 -13108 -799  13110 0
 13106  13107 -13108 -799 -13111 0

c  2+1 --> break 
c    (-b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧  p_799) -> break
c  in CNF:
c     b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ -p_799 ∨ break
c  in DIMACS:
 13106 -13107  13108 -799 1162 0


c  2-1 --> 1
c    (-b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧ -p_799) -> (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0)
c  in CNF:
c     b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_2
c     b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_1
c     b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨  b^{17, 48}_0
c  in DIMACS:
 13106 -13107  13108  799 -13109 0
 13106 -13107  13108  799 -13110 0
 13106 -13107  13108  799  13111 0

c  1-1 --> 0
c    (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0 ∧ -p_799) -> (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧ -b^{17, 48}_0)
c  in CNF:
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_2
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_1
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_0
c  in DIMACS:
 13106  13107 -13108  799 -13109 0
 13106  13107 -13108  799 -13110 0
 13106  13107 -13108  799 -13111 0

c  0-1 --> -1
c    (-b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧ -p_799) -> ( b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0)
c  in CNF:
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨  b^{17, 48}_2
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_1
c     b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨  b^{17, 48}_0
c  in DIMACS:
 13106  13107  13108  799  13109 0
 13106  13107  13108  799 -13110 0
 13106  13107  13108  799  13111 0

c  -1-1 --> -2
c    ( b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧  b^{17, 47}_0 ∧ -p_799) -> ( b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0)
c  in CNF:
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨  b^{17, 48}_2
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨  b^{17, 48}_1
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨  p_799 ∨ -b^{17, 48}_0
c  in DIMACS:
-13106  13107 -13108  799  13109 0
-13106  13107 -13108  799  13110 0
-13106  13107 -13108  799 -13111 0

c  -2-1 --> break 
c    ( b^{17, 47}_2 ∧  b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧ -p_799) -> break
c  in CNF:
c    -b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨  b^{17, 47}_0 ∨  p_799 ∨ break
c  in DIMACS:
-13106 -13107  13108  799 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 47}_2 ∧ -b^{17, 47}_1 ∧ -b^{17, 47}_0 ∧ true) 
c  in CNF:
c    -b^{17, 47}_2 ∨  b^{17, 47}_1 ∨  b^{17, 47}_0 ∨ false 
c  in DIMACS:
-13106  13107  13108  0

c  3 does not represent an automaton state.
c    -(-b^{17, 47}_2 ∧  b^{17, 47}_1 ∧  b^{17, 47}_0 ∧ true) 
c  in CNF:
c     b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ false 
c  in DIMACS:
 13106 -13107 -13108  0
c  -3 does not represent an automaton state.
c    -( b^{17, 47}_2 ∧  b^{17, 47}_1 ∧  b^{17, 47}_0 ∧ true) 
c  in CNF:
c    -b^{17, 47}_2 ∨ -b^{17, 47}_1 ∨ -b^{17, 47}_0 ∨ false 
c  in DIMACS:
-13106 -13107 -13108  0

c i = 48
c  -2+1 --> -1
c    ( b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧  p_816) -> ( b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0)
c  in CNF:
c    -b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨  b^{17, 49}_2
c    -b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_1
c    -b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨  b^{17, 49}_0
c  in DIMACS:
-13109 -13110  13111 -816  13112 0
-13109 -13110  13111 -816 -13113 0
-13109 -13110  13111 -816  13114 0

c  -1+1 --> 0
c    ( b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0 ∧  p_816) -> (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧ -b^{17, 49}_0)
c  in CNF:
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_2
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_1
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_0
c  in DIMACS:
-13109  13110 -13111 -816 -13112 0
-13109  13110 -13111 -816 -13113 0
-13109  13110 -13111 -816 -13114 0

c  0+1 --> 1
c    (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧  p_816) -> (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0)
c  in CNF:
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_2
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_1
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨  b^{17, 49}_0
c  in DIMACS:
 13109  13110  13111 -816 -13112 0
 13109  13110  13111 -816 -13113 0
 13109  13110  13111 -816  13114 0

c  1+1 --> 2
c    (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0 ∧  p_816) -> (-b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0)
c  in CNF:
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_2
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨  b^{17, 49}_1
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ -p_816 ∨ -b^{17, 49}_0
c  in DIMACS:
 13109  13110 -13111 -816 -13112 0
 13109  13110 -13111 -816  13113 0
 13109  13110 -13111 -816 -13114 0

c  2+1 --> break 
c    (-b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧  p_816) -> break
c  in CNF:
c     b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 13109 -13110  13111 -816 1162 0


c  2-1 --> 1
c    (-b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧ -p_816) -> (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0)
c  in CNF:
c     b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_2
c     b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_1
c     b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨  b^{17, 49}_0
c  in DIMACS:
 13109 -13110  13111  816 -13112 0
 13109 -13110  13111  816 -13113 0
 13109 -13110  13111  816  13114 0

c  1-1 --> 0
c    (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0 ∧ -p_816) -> (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧ -b^{17, 49}_0)
c  in CNF:
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_2
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_1
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_0
c  in DIMACS:
 13109  13110 -13111  816 -13112 0
 13109  13110 -13111  816 -13113 0
 13109  13110 -13111  816 -13114 0

c  0-1 --> -1
c    (-b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧ -p_816) -> ( b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0)
c  in CNF:
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨  b^{17, 49}_2
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_1
c     b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨  b^{17, 49}_0
c  in DIMACS:
 13109  13110  13111  816  13112 0
 13109  13110  13111  816 -13113 0
 13109  13110  13111  816  13114 0

c  -1-1 --> -2
c    ( b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧  b^{17, 48}_0 ∧ -p_816) -> ( b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0)
c  in CNF:
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨  b^{17, 49}_2
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨  b^{17, 49}_1
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨  p_816 ∨ -b^{17, 49}_0
c  in DIMACS:
-13109  13110 -13111  816  13112 0
-13109  13110 -13111  816  13113 0
-13109  13110 -13111  816 -13114 0

c  -2-1 --> break 
c    ( b^{17, 48}_2 ∧  b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨  b^{17, 48}_0 ∨  p_816 ∨ break
c  in DIMACS:
-13109 -13110  13111  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 48}_2 ∧ -b^{17, 48}_1 ∧ -b^{17, 48}_0 ∧ true) 
c  in CNF:
c    -b^{17, 48}_2 ∨  b^{17, 48}_1 ∨  b^{17, 48}_0 ∨ false 
c  in DIMACS:
-13109  13110  13111  0

c  3 does not represent an automaton state.
c    -(-b^{17, 48}_2 ∧  b^{17, 48}_1 ∧  b^{17, 48}_0 ∧ true) 
c  in CNF:
c     b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ false 
c  in DIMACS:
 13109 -13110 -13111  0
c  -3 does not represent an automaton state.
c    -( b^{17, 48}_2 ∧  b^{17, 48}_1 ∧  b^{17, 48}_0 ∧ true) 
c  in CNF:
c    -b^{17, 48}_2 ∨ -b^{17, 48}_1 ∨ -b^{17, 48}_0 ∨ false 
c  in DIMACS:
-13109 -13110 -13111  0

c i = 49
c  -2+1 --> -1
c    ( b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧  p_833) -> ( b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0)
c  in CNF:
c    -b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨  b^{17, 50}_2
c    -b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_1
c    -b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨  b^{17, 50}_0
c  in DIMACS:
-13112 -13113  13114 -833  13115 0
-13112 -13113  13114 -833 -13116 0
-13112 -13113  13114 -833  13117 0

c  -1+1 --> 0
c    ( b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0 ∧  p_833) -> (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧ -b^{17, 50}_0)
c  in CNF:
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_2
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_1
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_0
c  in DIMACS:
-13112  13113 -13114 -833 -13115 0
-13112  13113 -13114 -833 -13116 0
-13112  13113 -13114 -833 -13117 0

c  0+1 --> 1
c    (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧  p_833) -> (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0)
c  in CNF:
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_2
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_1
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨  b^{17, 50}_0
c  in DIMACS:
 13112  13113  13114 -833 -13115 0
 13112  13113  13114 -833 -13116 0
 13112  13113  13114 -833  13117 0

c  1+1 --> 2
c    (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0 ∧  p_833) -> (-b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0)
c  in CNF:
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_2
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨  b^{17, 50}_1
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ -p_833 ∨ -b^{17, 50}_0
c  in DIMACS:
 13112  13113 -13114 -833 -13115 0
 13112  13113 -13114 -833  13116 0
 13112  13113 -13114 -833 -13117 0

c  2+1 --> break 
c    (-b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧  p_833) -> break
c  in CNF:
c     b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ -p_833 ∨ break
c  in DIMACS:
 13112 -13113  13114 -833 1162 0


c  2-1 --> 1
c    (-b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧ -p_833) -> (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0)
c  in CNF:
c     b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_2
c     b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_1
c     b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨  b^{17, 50}_0
c  in DIMACS:
 13112 -13113  13114  833 -13115 0
 13112 -13113  13114  833 -13116 0
 13112 -13113  13114  833  13117 0

c  1-1 --> 0
c    (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0 ∧ -p_833) -> (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧ -b^{17, 50}_0)
c  in CNF:
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_2
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_1
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_0
c  in DIMACS:
 13112  13113 -13114  833 -13115 0
 13112  13113 -13114  833 -13116 0
 13112  13113 -13114  833 -13117 0

c  0-1 --> -1
c    (-b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧ -p_833) -> ( b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0)
c  in CNF:
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨  b^{17, 50}_2
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_1
c     b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨  b^{17, 50}_0
c  in DIMACS:
 13112  13113  13114  833  13115 0
 13112  13113  13114  833 -13116 0
 13112  13113  13114  833  13117 0

c  -1-1 --> -2
c    ( b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧  b^{17, 49}_0 ∧ -p_833) -> ( b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0)
c  in CNF:
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨  b^{17, 50}_2
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨  b^{17, 50}_1
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨  p_833 ∨ -b^{17, 50}_0
c  in DIMACS:
-13112  13113 -13114  833  13115 0
-13112  13113 -13114  833  13116 0
-13112  13113 -13114  833 -13117 0

c  -2-1 --> break 
c    ( b^{17, 49}_2 ∧  b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧ -p_833) -> break
c  in CNF:
c    -b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨  b^{17, 49}_0 ∨  p_833 ∨ break
c  in DIMACS:
-13112 -13113  13114  833 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 49}_2 ∧ -b^{17, 49}_1 ∧ -b^{17, 49}_0 ∧ true) 
c  in CNF:
c    -b^{17, 49}_2 ∨  b^{17, 49}_1 ∨  b^{17, 49}_0 ∨ false 
c  in DIMACS:
-13112  13113  13114  0

c  3 does not represent an automaton state.
c    -(-b^{17, 49}_2 ∧  b^{17, 49}_1 ∧  b^{17, 49}_0 ∧ true) 
c  in CNF:
c     b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ false 
c  in DIMACS:
 13112 -13113 -13114  0
c  -3 does not represent an automaton state.
c    -( b^{17, 49}_2 ∧  b^{17, 49}_1 ∧  b^{17, 49}_0 ∧ true) 
c  in CNF:
c    -b^{17, 49}_2 ∨ -b^{17, 49}_1 ∨ -b^{17, 49}_0 ∨ false 
c  in DIMACS:
-13112 -13113 -13114  0

c i = 50
c  -2+1 --> -1
c    ( b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧  p_850) -> ( b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0)
c  in CNF:
c    -b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨  b^{17, 51}_2
c    -b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_1
c    -b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨  b^{17, 51}_0
c  in DIMACS:
-13115 -13116  13117 -850  13118 0
-13115 -13116  13117 -850 -13119 0
-13115 -13116  13117 -850  13120 0

c  -1+1 --> 0
c    ( b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0 ∧  p_850) -> (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧ -b^{17, 51}_0)
c  in CNF:
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_2
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_1
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_0
c  in DIMACS:
-13115  13116 -13117 -850 -13118 0
-13115  13116 -13117 -850 -13119 0
-13115  13116 -13117 -850 -13120 0

c  0+1 --> 1
c    (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧  p_850) -> (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0)
c  in CNF:
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_2
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_1
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨  b^{17, 51}_0
c  in DIMACS:
 13115  13116  13117 -850 -13118 0
 13115  13116  13117 -850 -13119 0
 13115  13116  13117 -850  13120 0

c  1+1 --> 2
c    (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0 ∧  p_850) -> (-b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0)
c  in CNF:
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_2
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨  b^{17, 51}_1
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ -p_850 ∨ -b^{17, 51}_0
c  in DIMACS:
 13115  13116 -13117 -850 -13118 0
 13115  13116 -13117 -850  13119 0
 13115  13116 -13117 -850 -13120 0

c  2+1 --> break 
c    (-b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧  p_850) -> break
c  in CNF:
c     b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 13115 -13116  13117 -850 1162 0


c  2-1 --> 1
c    (-b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧ -p_850) -> (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0)
c  in CNF:
c     b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_2
c     b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_1
c     b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨  b^{17, 51}_0
c  in DIMACS:
 13115 -13116  13117  850 -13118 0
 13115 -13116  13117  850 -13119 0
 13115 -13116  13117  850  13120 0

c  1-1 --> 0
c    (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0 ∧ -p_850) -> (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧ -b^{17, 51}_0)
c  in CNF:
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_2
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_1
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_0
c  in DIMACS:
 13115  13116 -13117  850 -13118 0
 13115  13116 -13117  850 -13119 0
 13115  13116 -13117  850 -13120 0

c  0-1 --> -1
c    (-b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧ -p_850) -> ( b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0)
c  in CNF:
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨  b^{17, 51}_2
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_1
c     b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨  b^{17, 51}_0
c  in DIMACS:
 13115  13116  13117  850  13118 0
 13115  13116  13117  850 -13119 0
 13115  13116  13117  850  13120 0

c  -1-1 --> -2
c    ( b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧  b^{17, 50}_0 ∧ -p_850) -> ( b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0)
c  in CNF:
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨  b^{17, 51}_2
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨  b^{17, 51}_1
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨  p_850 ∨ -b^{17, 51}_0
c  in DIMACS:
-13115  13116 -13117  850  13118 0
-13115  13116 -13117  850  13119 0
-13115  13116 -13117  850 -13120 0

c  -2-1 --> break 
c    ( b^{17, 50}_2 ∧  b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨  b^{17, 50}_0 ∨  p_850 ∨ break
c  in DIMACS:
-13115 -13116  13117  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 50}_2 ∧ -b^{17, 50}_1 ∧ -b^{17, 50}_0 ∧ true) 
c  in CNF:
c    -b^{17, 50}_2 ∨  b^{17, 50}_1 ∨  b^{17, 50}_0 ∨ false 
c  in DIMACS:
-13115  13116  13117  0

c  3 does not represent an automaton state.
c    -(-b^{17, 50}_2 ∧  b^{17, 50}_1 ∧  b^{17, 50}_0 ∧ true) 
c  in CNF:
c     b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ false 
c  in DIMACS:
 13115 -13116 -13117  0
c  -3 does not represent an automaton state.
c    -( b^{17, 50}_2 ∧  b^{17, 50}_1 ∧  b^{17, 50}_0 ∧ true) 
c  in CNF:
c    -b^{17, 50}_2 ∨ -b^{17, 50}_1 ∨ -b^{17, 50}_0 ∨ false 
c  in DIMACS:
-13115 -13116 -13117  0

c i = 51
c  -2+1 --> -1
c    ( b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧  p_867) -> ( b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0)
c  in CNF:
c    -b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨  b^{17, 52}_2
c    -b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_1
c    -b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨  b^{17, 52}_0
c  in DIMACS:
-13118 -13119  13120 -867  13121 0
-13118 -13119  13120 -867 -13122 0
-13118 -13119  13120 -867  13123 0

c  -1+1 --> 0
c    ( b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0 ∧  p_867) -> (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧ -b^{17, 52}_0)
c  in CNF:
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_2
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_1
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_0
c  in DIMACS:
-13118  13119 -13120 -867 -13121 0
-13118  13119 -13120 -867 -13122 0
-13118  13119 -13120 -867 -13123 0

c  0+1 --> 1
c    (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧  p_867) -> (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0)
c  in CNF:
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_2
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_1
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨  b^{17, 52}_0
c  in DIMACS:
 13118  13119  13120 -867 -13121 0
 13118  13119  13120 -867 -13122 0
 13118  13119  13120 -867  13123 0

c  1+1 --> 2
c    (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0 ∧  p_867) -> (-b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0)
c  in CNF:
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_2
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨  b^{17, 52}_1
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ -p_867 ∨ -b^{17, 52}_0
c  in DIMACS:
 13118  13119 -13120 -867 -13121 0
 13118  13119 -13120 -867  13122 0
 13118  13119 -13120 -867 -13123 0

c  2+1 --> break 
c    (-b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧  p_867) -> break
c  in CNF:
c     b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ -p_867 ∨ break
c  in DIMACS:
 13118 -13119  13120 -867 1162 0


c  2-1 --> 1
c    (-b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧ -p_867) -> (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0)
c  in CNF:
c     b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_2
c     b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_1
c     b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨  b^{17, 52}_0
c  in DIMACS:
 13118 -13119  13120  867 -13121 0
 13118 -13119  13120  867 -13122 0
 13118 -13119  13120  867  13123 0

c  1-1 --> 0
c    (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0 ∧ -p_867) -> (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧ -b^{17, 52}_0)
c  in CNF:
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_2
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_1
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_0
c  in DIMACS:
 13118  13119 -13120  867 -13121 0
 13118  13119 -13120  867 -13122 0
 13118  13119 -13120  867 -13123 0

c  0-1 --> -1
c    (-b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧ -p_867) -> ( b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0)
c  in CNF:
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨  b^{17, 52}_2
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_1
c     b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨  b^{17, 52}_0
c  in DIMACS:
 13118  13119  13120  867  13121 0
 13118  13119  13120  867 -13122 0
 13118  13119  13120  867  13123 0

c  -1-1 --> -2
c    ( b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧  b^{17, 51}_0 ∧ -p_867) -> ( b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0)
c  in CNF:
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨  b^{17, 52}_2
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨  b^{17, 52}_1
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨  p_867 ∨ -b^{17, 52}_0
c  in DIMACS:
-13118  13119 -13120  867  13121 0
-13118  13119 -13120  867  13122 0
-13118  13119 -13120  867 -13123 0

c  -2-1 --> break 
c    ( b^{17, 51}_2 ∧  b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧ -p_867) -> break
c  in CNF:
c    -b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨  b^{17, 51}_0 ∨  p_867 ∨ break
c  in DIMACS:
-13118 -13119  13120  867 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 51}_2 ∧ -b^{17, 51}_1 ∧ -b^{17, 51}_0 ∧ true) 
c  in CNF:
c    -b^{17, 51}_2 ∨  b^{17, 51}_1 ∨  b^{17, 51}_0 ∨ false 
c  in DIMACS:
-13118  13119  13120  0

c  3 does not represent an automaton state.
c    -(-b^{17, 51}_2 ∧  b^{17, 51}_1 ∧  b^{17, 51}_0 ∧ true) 
c  in CNF:
c     b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ false 
c  in DIMACS:
 13118 -13119 -13120  0
c  -3 does not represent an automaton state.
c    -( b^{17, 51}_2 ∧  b^{17, 51}_1 ∧  b^{17, 51}_0 ∧ true) 
c  in CNF:
c    -b^{17, 51}_2 ∨ -b^{17, 51}_1 ∨ -b^{17, 51}_0 ∨ false 
c  in DIMACS:
-13118 -13119 -13120  0

c i = 52
c  -2+1 --> -1
c    ( b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧  p_884) -> ( b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0)
c  in CNF:
c    -b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨  b^{17, 53}_2
c    -b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_1
c    -b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨  b^{17, 53}_0
c  in DIMACS:
-13121 -13122  13123 -884  13124 0
-13121 -13122  13123 -884 -13125 0
-13121 -13122  13123 -884  13126 0

c  -1+1 --> 0
c    ( b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0 ∧  p_884) -> (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧ -b^{17, 53}_0)
c  in CNF:
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_2
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_1
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_0
c  in DIMACS:
-13121  13122 -13123 -884 -13124 0
-13121  13122 -13123 -884 -13125 0
-13121  13122 -13123 -884 -13126 0

c  0+1 --> 1
c    (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧  p_884) -> (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0)
c  in CNF:
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_2
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_1
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨  b^{17, 53}_0
c  in DIMACS:
 13121  13122  13123 -884 -13124 0
 13121  13122  13123 -884 -13125 0
 13121  13122  13123 -884  13126 0

c  1+1 --> 2
c    (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0 ∧  p_884) -> (-b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0)
c  in CNF:
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_2
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨  b^{17, 53}_1
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ -p_884 ∨ -b^{17, 53}_0
c  in DIMACS:
 13121  13122 -13123 -884 -13124 0
 13121  13122 -13123 -884  13125 0
 13121  13122 -13123 -884 -13126 0

c  2+1 --> break 
c    (-b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧  p_884) -> break
c  in CNF:
c     b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 13121 -13122  13123 -884 1162 0


c  2-1 --> 1
c    (-b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧ -p_884) -> (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0)
c  in CNF:
c     b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_2
c     b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_1
c     b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨  b^{17, 53}_0
c  in DIMACS:
 13121 -13122  13123  884 -13124 0
 13121 -13122  13123  884 -13125 0
 13121 -13122  13123  884  13126 0

c  1-1 --> 0
c    (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0 ∧ -p_884) -> (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧ -b^{17, 53}_0)
c  in CNF:
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_2
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_1
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_0
c  in DIMACS:
 13121  13122 -13123  884 -13124 0
 13121  13122 -13123  884 -13125 0
 13121  13122 -13123  884 -13126 0

c  0-1 --> -1
c    (-b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧ -p_884) -> ( b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0)
c  in CNF:
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨  b^{17, 53}_2
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_1
c     b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨  b^{17, 53}_0
c  in DIMACS:
 13121  13122  13123  884  13124 0
 13121  13122  13123  884 -13125 0
 13121  13122  13123  884  13126 0

c  -1-1 --> -2
c    ( b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧  b^{17, 52}_0 ∧ -p_884) -> ( b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0)
c  in CNF:
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨  b^{17, 53}_2
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨  b^{17, 53}_1
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨  p_884 ∨ -b^{17, 53}_0
c  in DIMACS:
-13121  13122 -13123  884  13124 0
-13121  13122 -13123  884  13125 0
-13121  13122 -13123  884 -13126 0

c  -2-1 --> break 
c    ( b^{17, 52}_2 ∧  b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨  b^{17, 52}_0 ∨  p_884 ∨ break
c  in DIMACS:
-13121 -13122  13123  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 52}_2 ∧ -b^{17, 52}_1 ∧ -b^{17, 52}_0 ∧ true) 
c  in CNF:
c    -b^{17, 52}_2 ∨  b^{17, 52}_1 ∨  b^{17, 52}_0 ∨ false 
c  in DIMACS:
-13121  13122  13123  0

c  3 does not represent an automaton state.
c    -(-b^{17, 52}_2 ∧  b^{17, 52}_1 ∧  b^{17, 52}_0 ∧ true) 
c  in CNF:
c     b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ false 
c  in DIMACS:
 13121 -13122 -13123  0
c  -3 does not represent an automaton state.
c    -( b^{17, 52}_2 ∧  b^{17, 52}_1 ∧  b^{17, 52}_0 ∧ true) 
c  in CNF:
c    -b^{17, 52}_2 ∨ -b^{17, 52}_1 ∨ -b^{17, 52}_0 ∨ false 
c  in DIMACS:
-13121 -13122 -13123  0

c i = 53
c  -2+1 --> -1
c    ( b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧  p_901) -> ( b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0)
c  in CNF:
c    -b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨  b^{17, 54}_2
c    -b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_1
c    -b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨  b^{17, 54}_0
c  in DIMACS:
-13124 -13125  13126 -901  13127 0
-13124 -13125  13126 -901 -13128 0
-13124 -13125  13126 -901  13129 0

c  -1+1 --> 0
c    ( b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0 ∧  p_901) -> (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧ -b^{17, 54}_0)
c  in CNF:
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_2
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_1
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_0
c  in DIMACS:
-13124  13125 -13126 -901 -13127 0
-13124  13125 -13126 -901 -13128 0
-13124  13125 -13126 -901 -13129 0

c  0+1 --> 1
c    (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧  p_901) -> (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0)
c  in CNF:
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_2
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_1
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨  b^{17, 54}_0
c  in DIMACS:
 13124  13125  13126 -901 -13127 0
 13124  13125  13126 -901 -13128 0
 13124  13125  13126 -901  13129 0

c  1+1 --> 2
c    (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0 ∧  p_901) -> (-b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0)
c  in CNF:
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_2
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨  b^{17, 54}_1
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ -p_901 ∨ -b^{17, 54}_0
c  in DIMACS:
 13124  13125 -13126 -901 -13127 0
 13124  13125 -13126 -901  13128 0
 13124  13125 -13126 -901 -13129 0

c  2+1 --> break 
c    (-b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧  p_901) -> break
c  in CNF:
c     b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ -p_901 ∨ break
c  in DIMACS:
 13124 -13125  13126 -901 1162 0


c  2-1 --> 1
c    (-b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧ -p_901) -> (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0)
c  in CNF:
c     b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_2
c     b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_1
c     b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨  b^{17, 54}_0
c  in DIMACS:
 13124 -13125  13126  901 -13127 0
 13124 -13125  13126  901 -13128 0
 13124 -13125  13126  901  13129 0

c  1-1 --> 0
c    (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0 ∧ -p_901) -> (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧ -b^{17, 54}_0)
c  in CNF:
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_2
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_1
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_0
c  in DIMACS:
 13124  13125 -13126  901 -13127 0
 13124  13125 -13126  901 -13128 0
 13124  13125 -13126  901 -13129 0

c  0-1 --> -1
c    (-b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧ -p_901) -> ( b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0)
c  in CNF:
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨  b^{17, 54}_2
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_1
c     b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨  b^{17, 54}_0
c  in DIMACS:
 13124  13125  13126  901  13127 0
 13124  13125  13126  901 -13128 0
 13124  13125  13126  901  13129 0

c  -1-1 --> -2
c    ( b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧  b^{17, 53}_0 ∧ -p_901) -> ( b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0)
c  in CNF:
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨  b^{17, 54}_2
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨  b^{17, 54}_1
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨  p_901 ∨ -b^{17, 54}_0
c  in DIMACS:
-13124  13125 -13126  901  13127 0
-13124  13125 -13126  901  13128 0
-13124  13125 -13126  901 -13129 0

c  -2-1 --> break 
c    ( b^{17, 53}_2 ∧  b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧ -p_901) -> break
c  in CNF:
c    -b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨  b^{17, 53}_0 ∨  p_901 ∨ break
c  in DIMACS:
-13124 -13125  13126  901 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 53}_2 ∧ -b^{17, 53}_1 ∧ -b^{17, 53}_0 ∧ true) 
c  in CNF:
c    -b^{17, 53}_2 ∨  b^{17, 53}_1 ∨  b^{17, 53}_0 ∨ false 
c  in DIMACS:
-13124  13125  13126  0

c  3 does not represent an automaton state.
c    -(-b^{17, 53}_2 ∧  b^{17, 53}_1 ∧  b^{17, 53}_0 ∧ true) 
c  in CNF:
c     b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ false 
c  in DIMACS:
 13124 -13125 -13126  0
c  -3 does not represent an automaton state.
c    -( b^{17, 53}_2 ∧  b^{17, 53}_1 ∧  b^{17, 53}_0 ∧ true) 
c  in CNF:
c    -b^{17, 53}_2 ∨ -b^{17, 53}_1 ∨ -b^{17, 53}_0 ∨ false 
c  in DIMACS:
-13124 -13125 -13126  0

c i = 54
c  -2+1 --> -1
c    ( b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧  p_918) -> ( b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0)
c  in CNF:
c    -b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨  b^{17, 55}_2
c    -b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_1
c    -b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨  b^{17, 55}_0
c  in DIMACS:
-13127 -13128  13129 -918  13130 0
-13127 -13128  13129 -918 -13131 0
-13127 -13128  13129 -918  13132 0

c  -1+1 --> 0
c    ( b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0 ∧  p_918) -> (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧ -b^{17, 55}_0)
c  in CNF:
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_2
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_1
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_0
c  in DIMACS:
-13127  13128 -13129 -918 -13130 0
-13127  13128 -13129 -918 -13131 0
-13127  13128 -13129 -918 -13132 0

c  0+1 --> 1
c    (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧  p_918) -> (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0)
c  in CNF:
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_2
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_1
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨  b^{17, 55}_0
c  in DIMACS:
 13127  13128  13129 -918 -13130 0
 13127  13128  13129 -918 -13131 0
 13127  13128  13129 -918  13132 0

c  1+1 --> 2
c    (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0 ∧  p_918) -> (-b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0)
c  in CNF:
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_2
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨  b^{17, 55}_1
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ -p_918 ∨ -b^{17, 55}_0
c  in DIMACS:
 13127  13128 -13129 -918 -13130 0
 13127  13128 -13129 -918  13131 0
 13127  13128 -13129 -918 -13132 0

c  2+1 --> break 
c    (-b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧  p_918) -> break
c  in CNF:
c     b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 13127 -13128  13129 -918 1162 0


c  2-1 --> 1
c    (-b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧ -p_918) -> (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0)
c  in CNF:
c     b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_2
c     b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_1
c     b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨  b^{17, 55}_0
c  in DIMACS:
 13127 -13128  13129  918 -13130 0
 13127 -13128  13129  918 -13131 0
 13127 -13128  13129  918  13132 0

c  1-1 --> 0
c    (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0 ∧ -p_918) -> (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧ -b^{17, 55}_0)
c  in CNF:
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_2
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_1
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_0
c  in DIMACS:
 13127  13128 -13129  918 -13130 0
 13127  13128 -13129  918 -13131 0
 13127  13128 -13129  918 -13132 0

c  0-1 --> -1
c    (-b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧ -p_918) -> ( b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0)
c  in CNF:
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨  b^{17, 55}_2
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_1
c     b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨  b^{17, 55}_0
c  in DIMACS:
 13127  13128  13129  918  13130 0
 13127  13128  13129  918 -13131 0
 13127  13128  13129  918  13132 0

c  -1-1 --> -2
c    ( b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧  b^{17, 54}_0 ∧ -p_918) -> ( b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0)
c  in CNF:
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨  b^{17, 55}_2
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨  b^{17, 55}_1
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨  p_918 ∨ -b^{17, 55}_0
c  in DIMACS:
-13127  13128 -13129  918  13130 0
-13127  13128 -13129  918  13131 0
-13127  13128 -13129  918 -13132 0

c  -2-1 --> break 
c    ( b^{17, 54}_2 ∧  b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨  b^{17, 54}_0 ∨  p_918 ∨ break
c  in DIMACS:
-13127 -13128  13129  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 54}_2 ∧ -b^{17, 54}_1 ∧ -b^{17, 54}_0 ∧ true) 
c  in CNF:
c    -b^{17, 54}_2 ∨  b^{17, 54}_1 ∨  b^{17, 54}_0 ∨ false 
c  in DIMACS:
-13127  13128  13129  0

c  3 does not represent an automaton state.
c    -(-b^{17, 54}_2 ∧  b^{17, 54}_1 ∧  b^{17, 54}_0 ∧ true) 
c  in CNF:
c     b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ false 
c  in DIMACS:
 13127 -13128 -13129  0
c  -3 does not represent an automaton state.
c    -( b^{17, 54}_2 ∧  b^{17, 54}_1 ∧  b^{17, 54}_0 ∧ true) 
c  in CNF:
c    -b^{17, 54}_2 ∨ -b^{17, 54}_1 ∨ -b^{17, 54}_0 ∨ false 
c  in DIMACS:
-13127 -13128 -13129  0

c i = 55
c  -2+1 --> -1
c    ( b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧  p_935) -> ( b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0)
c  in CNF:
c    -b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨  b^{17, 56}_2
c    -b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_1
c    -b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨  b^{17, 56}_0
c  in DIMACS:
-13130 -13131  13132 -935  13133 0
-13130 -13131  13132 -935 -13134 0
-13130 -13131  13132 -935  13135 0

c  -1+1 --> 0
c    ( b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0 ∧  p_935) -> (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧ -b^{17, 56}_0)
c  in CNF:
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_2
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_1
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_0
c  in DIMACS:
-13130  13131 -13132 -935 -13133 0
-13130  13131 -13132 -935 -13134 0
-13130  13131 -13132 -935 -13135 0

c  0+1 --> 1
c    (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧  p_935) -> (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0)
c  in CNF:
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_2
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_1
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨  b^{17, 56}_0
c  in DIMACS:
 13130  13131  13132 -935 -13133 0
 13130  13131  13132 -935 -13134 0
 13130  13131  13132 -935  13135 0

c  1+1 --> 2
c    (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0 ∧  p_935) -> (-b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0)
c  in CNF:
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_2
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨  b^{17, 56}_1
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ -p_935 ∨ -b^{17, 56}_0
c  in DIMACS:
 13130  13131 -13132 -935 -13133 0
 13130  13131 -13132 -935  13134 0
 13130  13131 -13132 -935 -13135 0

c  2+1 --> break 
c    (-b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧  p_935) -> break
c  in CNF:
c     b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 13130 -13131  13132 -935 1162 0


c  2-1 --> 1
c    (-b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧ -p_935) -> (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0)
c  in CNF:
c     b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_2
c     b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_1
c     b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨  b^{17, 56}_0
c  in DIMACS:
 13130 -13131  13132  935 -13133 0
 13130 -13131  13132  935 -13134 0
 13130 -13131  13132  935  13135 0

c  1-1 --> 0
c    (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0 ∧ -p_935) -> (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧ -b^{17, 56}_0)
c  in CNF:
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_2
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_1
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_0
c  in DIMACS:
 13130  13131 -13132  935 -13133 0
 13130  13131 -13132  935 -13134 0
 13130  13131 -13132  935 -13135 0

c  0-1 --> -1
c    (-b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧ -p_935) -> ( b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0)
c  in CNF:
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨  b^{17, 56}_2
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_1
c     b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨  b^{17, 56}_0
c  in DIMACS:
 13130  13131  13132  935  13133 0
 13130  13131  13132  935 -13134 0
 13130  13131  13132  935  13135 0

c  -1-1 --> -2
c    ( b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧  b^{17, 55}_0 ∧ -p_935) -> ( b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0)
c  in CNF:
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨  b^{17, 56}_2
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨  b^{17, 56}_1
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨  p_935 ∨ -b^{17, 56}_0
c  in DIMACS:
-13130  13131 -13132  935  13133 0
-13130  13131 -13132  935  13134 0
-13130  13131 -13132  935 -13135 0

c  -2-1 --> break 
c    ( b^{17, 55}_2 ∧  b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨  b^{17, 55}_0 ∨  p_935 ∨ break
c  in DIMACS:
-13130 -13131  13132  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 55}_2 ∧ -b^{17, 55}_1 ∧ -b^{17, 55}_0 ∧ true) 
c  in CNF:
c    -b^{17, 55}_2 ∨  b^{17, 55}_1 ∨  b^{17, 55}_0 ∨ false 
c  in DIMACS:
-13130  13131  13132  0

c  3 does not represent an automaton state.
c    -(-b^{17, 55}_2 ∧  b^{17, 55}_1 ∧  b^{17, 55}_0 ∧ true) 
c  in CNF:
c     b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ false 
c  in DIMACS:
 13130 -13131 -13132  0
c  -3 does not represent an automaton state.
c    -( b^{17, 55}_2 ∧  b^{17, 55}_1 ∧  b^{17, 55}_0 ∧ true) 
c  in CNF:
c    -b^{17, 55}_2 ∨ -b^{17, 55}_1 ∨ -b^{17, 55}_0 ∨ false 
c  in DIMACS:
-13130 -13131 -13132  0

c i = 56
c  -2+1 --> -1
c    ( b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧  p_952) -> ( b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0)
c  in CNF:
c    -b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨  b^{17, 57}_2
c    -b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_1
c    -b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨  b^{17, 57}_0
c  in DIMACS:
-13133 -13134  13135 -952  13136 0
-13133 -13134  13135 -952 -13137 0
-13133 -13134  13135 -952  13138 0

c  -1+1 --> 0
c    ( b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0 ∧  p_952) -> (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧ -b^{17, 57}_0)
c  in CNF:
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_2
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_1
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_0
c  in DIMACS:
-13133  13134 -13135 -952 -13136 0
-13133  13134 -13135 -952 -13137 0
-13133  13134 -13135 -952 -13138 0

c  0+1 --> 1
c    (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧  p_952) -> (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0)
c  in CNF:
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_2
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_1
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨  b^{17, 57}_0
c  in DIMACS:
 13133  13134  13135 -952 -13136 0
 13133  13134  13135 -952 -13137 0
 13133  13134  13135 -952  13138 0

c  1+1 --> 2
c    (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0 ∧  p_952) -> (-b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0)
c  in CNF:
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_2
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨  b^{17, 57}_1
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ -p_952 ∨ -b^{17, 57}_0
c  in DIMACS:
 13133  13134 -13135 -952 -13136 0
 13133  13134 -13135 -952  13137 0
 13133  13134 -13135 -952 -13138 0

c  2+1 --> break 
c    (-b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧  p_952) -> break
c  in CNF:
c     b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 13133 -13134  13135 -952 1162 0


c  2-1 --> 1
c    (-b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧ -p_952) -> (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0)
c  in CNF:
c     b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_2
c     b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_1
c     b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨  b^{17, 57}_0
c  in DIMACS:
 13133 -13134  13135  952 -13136 0
 13133 -13134  13135  952 -13137 0
 13133 -13134  13135  952  13138 0

c  1-1 --> 0
c    (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0 ∧ -p_952) -> (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧ -b^{17, 57}_0)
c  in CNF:
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_2
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_1
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_0
c  in DIMACS:
 13133  13134 -13135  952 -13136 0
 13133  13134 -13135  952 -13137 0
 13133  13134 -13135  952 -13138 0

c  0-1 --> -1
c    (-b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧ -p_952) -> ( b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0)
c  in CNF:
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨  b^{17, 57}_2
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_1
c     b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨  b^{17, 57}_0
c  in DIMACS:
 13133  13134  13135  952  13136 0
 13133  13134  13135  952 -13137 0
 13133  13134  13135  952  13138 0

c  -1-1 --> -2
c    ( b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧  b^{17, 56}_0 ∧ -p_952) -> ( b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0)
c  in CNF:
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨  b^{17, 57}_2
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨  b^{17, 57}_1
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨  p_952 ∨ -b^{17, 57}_0
c  in DIMACS:
-13133  13134 -13135  952  13136 0
-13133  13134 -13135  952  13137 0
-13133  13134 -13135  952 -13138 0

c  -2-1 --> break 
c    ( b^{17, 56}_2 ∧  b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨  b^{17, 56}_0 ∨  p_952 ∨ break
c  in DIMACS:
-13133 -13134  13135  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 56}_2 ∧ -b^{17, 56}_1 ∧ -b^{17, 56}_0 ∧ true) 
c  in CNF:
c    -b^{17, 56}_2 ∨  b^{17, 56}_1 ∨  b^{17, 56}_0 ∨ false 
c  in DIMACS:
-13133  13134  13135  0

c  3 does not represent an automaton state.
c    -(-b^{17, 56}_2 ∧  b^{17, 56}_1 ∧  b^{17, 56}_0 ∧ true) 
c  in CNF:
c     b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ false 
c  in DIMACS:
 13133 -13134 -13135  0
c  -3 does not represent an automaton state.
c    -( b^{17, 56}_2 ∧  b^{17, 56}_1 ∧  b^{17, 56}_0 ∧ true) 
c  in CNF:
c    -b^{17, 56}_2 ∨ -b^{17, 56}_1 ∨ -b^{17, 56}_0 ∨ false 
c  in DIMACS:
-13133 -13134 -13135  0

c i = 57
c  -2+1 --> -1
c    ( b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧  p_969) -> ( b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0)
c  in CNF:
c    -b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨  b^{17, 58}_2
c    -b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_1
c    -b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨  b^{17, 58}_0
c  in DIMACS:
-13136 -13137  13138 -969  13139 0
-13136 -13137  13138 -969 -13140 0
-13136 -13137  13138 -969  13141 0

c  -1+1 --> 0
c    ( b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0 ∧  p_969) -> (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧ -b^{17, 58}_0)
c  in CNF:
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_2
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_1
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_0
c  in DIMACS:
-13136  13137 -13138 -969 -13139 0
-13136  13137 -13138 -969 -13140 0
-13136  13137 -13138 -969 -13141 0

c  0+1 --> 1
c    (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧  p_969) -> (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0)
c  in CNF:
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_2
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_1
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨  b^{17, 58}_0
c  in DIMACS:
 13136  13137  13138 -969 -13139 0
 13136  13137  13138 -969 -13140 0
 13136  13137  13138 -969  13141 0

c  1+1 --> 2
c    (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0 ∧  p_969) -> (-b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0)
c  in CNF:
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_2
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨  b^{17, 58}_1
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ -p_969 ∨ -b^{17, 58}_0
c  in DIMACS:
 13136  13137 -13138 -969 -13139 0
 13136  13137 -13138 -969  13140 0
 13136  13137 -13138 -969 -13141 0

c  2+1 --> break 
c    (-b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧  p_969) -> break
c  in CNF:
c     b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 13136 -13137  13138 -969 1162 0


c  2-1 --> 1
c    (-b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧ -p_969) -> (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0)
c  in CNF:
c     b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_2
c     b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_1
c     b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨  b^{17, 58}_0
c  in DIMACS:
 13136 -13137  13138  969 -13139 0
 13136 -13137  13138  969 -13140 0
 13136 -13137  13138  969  13141 0

c  1-1 --> 0
c    (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0 ∧ -p_969) -> (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧ -b^{17, 58}_0)
c  in CNF:
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_2
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_1
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_0
c  in DIMACS:
 13136  13137 -13138  969 -13139 0
 13136  13137 -13138  969 -13140 0
 13136  13137 -13138  969 -13141 0

c  0-1 --> -1
c    (-b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧ -p_969) -> ( b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0)
c  in CNF:
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨  b^{17, 58}_2
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_1
c     b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨  b^{17, 58}_0
c  in DIMACS:
 13136  13137  13138  969  13139 0
 13136  13137  13138  969 -13140 0
 13136  13137  13138  969  13141 0

c  -1-1 --> -2
c    ( b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧  b^{17, 57}_0 ∧ -p_969) -> ( b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0)
c  in CNF:
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨  b^{17, 58}_2
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨  b^{17, 58}_1
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨  p_969 ∨ -b^{17, 58}_0
c  in DIMACS:
-13136  13137 -13138  969  13139 0
-13136  13137 -13138  969  13140 0
-13136  13137 -13138  969 -13141 0

c  -2-1 --> break 
c    ( b^{17, 57}_2 ∧  b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨  b^{17, 57}_0 ∨  p_969 ∨ break
c  in DIMACS:
-13136 -13137  13138  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 57}_2 ∧ -b^{17, 57}_1 ∧ -b^{17, 57}_0 ∧ true) 
c  in CNF:
c    -b^{17, 57}_2 ∨  b^{17, 57}_1 ∨  b^{17, 57}_0 ∨ false 
c  in DIMACS:
-13136  13137  13138  0

c  3 does not represent an automaton state.
c    -(-b^{17, 57}_2 ∧  b^{17, 57}_1 ∧  b^{17, 57}_0 ∧ true) 
c  in CNF:
c     b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ false 
c  in DIMACS:
 13136 -13137 -13138  0
c  -3 does not represent an automaton state.
c    -( b^{17, 57}_2 ∧  b^{17, 57}_1 ∧  b^{17, 57}_0 ∧ true) 
c  in CNF:
c    -b^{17, 57}_2 ∨ -b^{17, 57}_1 ∨ -b^{17, 57}_0 ∨ false 
c  in DIMACS:
-13136 -13137 -13138  0

c i = 58
c  -2+1 --> -1
c    ( b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧  p_986) -> ( b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0)
c  in CNF:
c    -b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨  b^{17, 59}_2
c    -b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_1
c    -b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨  b^{17, 59}_0
c  in DIMACS:
-13139 -13140  13141 -986  13142 0
-13139 -13140  13141 -986 -13143 0
-13139 -13140  13141 -986  13144 0

c  -1+1 --> 0
c    ( b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0 ∧  p_986) -> (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧ -b^{17, 59}_0)
c  in CNF:
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_2
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_1
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_0
c  in DIMACS:
-13139  13140 -13141 -986 -13142 0
-13139  13140 -13141 -986 -13143 0
-13139  13140 -13141 -986 -13144 0

c  0+1 --> 1
c    (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧  p_986) -> (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0)
c  in CNF:
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_2
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_1
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨  b^{17, 59}_0
c  in DIMACS:
 13139  13140  13141 -986 -13142 0
 13139  13140  13141 -986 -13143 0
 13139  13140  13141 -986  13144 0

c  1+1 --> 2
c    (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0 ∧  p_986) -> (-b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0)
c  in CNF:
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_2
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨  b^{17, 59}_1
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ -p_986 ∨ -b^{17, 59}_0
c  in DIMACS:
 13139  13140 -13141 -986 -13142 0
 13139  13140 -13141 -986  13143 0
 13139  13140 -13141 -986 -13144 0

c  2+1 --> break 
c    (-b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧  p_986) -> break
c  in CNF:
c     b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 13139 -13140  13141 -986 1162 0


c  2-1 --> 1
c    (-b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧ -p_986) -> (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0)
c  in CNF:
c     b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_2
c     b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_1
c     b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨  b^{17, 59}_0
c  in DIMACS:
 13139 -13140  13141  986 -13142 0
 13139 -13140  13141  986 -13143 0
 13139 -13140  13141  986  13144 0

c  1-1 --> 0
c    (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0 ∧ -p_986) -> (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧ -b^{17, 59}_0)
c  in CNF:
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_2
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_1
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_0
c  in DIMACS:
 13139  13140 -13141  986 -13142 0
 13139  13140 -13141  986 -13143 0
 13139  13140 -13141  986 -13144 0

c  0-1 --> -1
c    (-b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧ -p_986) -> ( b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0)
c  in CNF:
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨  b^{17, 59}_2
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_1
c     b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨  b^{17, 59}_0
c  in DIMACS:
 13139  13140  13141  986  13142 0
 13139  13140  13141  986 -13143 0
 13139  13140  13141  986  13144 0

c  -1-1 --> -2
c    ( b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧  b^{17, 58}_0 ∧ -p_986) -> ( b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0)
c  in CNF:
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨  b^{17, 59}_2
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨  b^{17, 59}_1
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨  p_986 ∨ -b^{17, 59}_0
c  in DIMACS:
-13139  13140 -13141  986  13142 0
-13139  13140 -13141  986  13143 0
-13139  13140 -13141  986 -13144 0

c  -2-1 --> break 
c    ( b^{17, 58}_2 ∧  b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨  b^{17, 58}_0 ∨  p_986 ∨ break
c  in DIMACS:
-13139 -13140  13141  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 58}_2 ∧ -b^{17, 58}_1 ∧ -b^{17, 58}_0 ∧ true) 
c  in CNF:
c    -b^{17, 58}_2 ∨  b^{17, 58}_1 ∨  b^{17, 58}_0 ∨ false 
c  in DIMACS:
-13139  13140  13141  0

c  3 does not represent an automaton state.
c    -(-b^{17, 58}_2 ∧  b^{17, 58}_1 ∧  b^{17, 58}_0 ∧ true) 
c  in CNF:
c     b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ false 
c  in DIMACS:
 13139 -13140 -13141  0
c  -3 does not represent an automaton state.
c    -( b^{17, 58}_2 ∧  b^{17, 58}_1 ∧  b^{17, 58}_0 ∧ true) 
c  in CNF:
c    -b^{17, 58}_2 ∨ -b^{17, 58}_1 ∨ -b^{17, 58}_0 ∨ false 
c  in DIMACS:
-13139 -13140 -13141  0

c i = 59
c  -2+1 --> -1
c    ( b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧  p_1003) -> ( b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0)
c  in CNF:
c    -b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨  b^{17, 60}_2
c    -b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_1
c    -b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨  b^{17, 60}_0
c  in DIMACS:
-13142 -13143  13144 -1003  13145 0
-13142 -13143  13144 -1003 -13146 0
-13142 -13143  13144 -1003  13147 0

c  -1+1 --> 0
c    ( b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0 ∧  p_1003) -> (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧ -b^{17, 60}_0)
c  in CNF:
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_2
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_1
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_0
c  in DIMACS:
-13142  13143 -13144 -1003 -13145 0
-13142  13143 -13144 -1003 -13146 0
-13142  13143 -13144 -1003 -13147 0

c  0+1 --> 1
c    (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧  p_1003) -> (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0)
c  in CNF:
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_2
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_1
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨  b^{17, 60}_0
c  in DIMACS:
 13142  13143  13144 -1003 -13145 0
 13142  13143  13144 -1003 -13146 0
 13142  13143  13144 -1003  13147 0

c  1+1 --> 2
c    (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0 ∧  p_1003) -> (-b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0)
c  in CNF:
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_2
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨  b^{17, 60}_1
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ -p_1003 ∨ -b^{17, 60}_0
c  in DIMACS:
 13142  13143 -13144 -1003 -13145 0
 13142  13143 -13144 -1003  13146 0
 13142  13143 -13144 -1003 -13147 0

c  2+1 --> break 
c    (-b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧  p_1003) -> break
c  in CNF:
c     b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ -p_1003 ∨ break
c  in DIMACS:
 13142 -13143  13144 -1003 1162 0


c  2-1 --> 1
c    (-b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧ -p_1003) -> (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0)
c  in CNF:
c     b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_2
c     b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_1
c     b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨  b^{17, 60}_0
c  in DIMACS:
 13142 -13143  13144  1003 -13145 0
 13142 -13143  13144  1003 -13146 0
 13142 -13143  13144  1003  13147 0

c  1-1 --> 0
c    (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0 ∧ -p_1003) -> (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧ -b^{17, 60}_0)
c  in CNF:
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_2
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_1
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_0
c  in DIMACS:
 13142  13143 -13144  1003 -13145 0
 13142  13143 -13144  1003 -13146 0
 13142  13143 -13144  1003 -13147 0

c  0-1 --> -1
c    (-b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧ -p_1003) -> ( b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0)
c  in CNF:
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨  b^{17, 60}_2
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_1
c     b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨  b^{17, 60}_0
c  in DIMACS:
 13142  13143  13144  1003  13145 0
 13142  13143  13144  1003 -13146 0
 13142  13143  13144  1003  13147 0

c  -1-1 --> -2
c    ( b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧  b^{17, 59}_0 ∧ -p_1003) -> ( b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0)
c  in CNF:
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨  b^{17, 60}_2
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨  b^{17, 60}_1
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨  p_1003 ∨ -b^{17, 60}_0
c  in DIMACS:
-13142  13143 -13144  1003  13145 0
-13142  13143 -13144  1003  13146 0
-13142  13143 -13144  1003 -13147 0

c  -2-1 --> break 
c    ( b^{17, 59}_2 ∧  b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧ -p_1003) -> break
c  in CNF:
c    -b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨  b^{17, 59}_0 ∨  p_1003 ∨ break
c  in DIMACS:
-13142 -13143  13144  1003 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 59}_2 ∧ -b^{17, 59}_1 ∧ -b^{17, 59}_0 ∧ true) 
c  in CNF:
c    -b^{17, 59}_2 ∨  b^{17, 59}_1 ∨  b^{17, 59}_0 ∨ false 
c  in DIMACS:
-13142  13143  13144  0

c  3 does not represent an automaton state.
c    -(-b^{17, 59}_2 ∧  b^{17, 59}_1 ∧  b^{17, 59}_0 ∧ true) 
c  in CNF:
c     b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ false 
c  in DIMACS:
 13142 -13143 -13144  0
c  -3 does not represent an automaton state.
c    -( b^{17, 59}_2 ∧  b^{17, 59}_1 ∧  b^{17, 59}_0 ∧ true) 
c  in CNF:
c    -b^{17, 59}_2 ∨ -b^{17, 59}_1 ∨ -b^{17, 59}_0 ∨ false 
c  in DIMACS:
-13142 -13143 -13144  0

c i = 60
c  -2+1 --> -1
c    ( b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧  p_1020) -> ( b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0)
c  in CNF:
c    -b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨  b^{17, 61}_2
c    -b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_1
c    -b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨  b^{17, 61}_0
c  in DIMACS:
-13145 -13146  13147 -1020  13148 0
-13145 -13146  13147 -1020 -13149 0
-13145 -13146  13147 -1020  13150 0

c  -1+1 --> 0
c    ( b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0 ∧  p_1020) -> (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧ -b^{17, 61}_0)
c  in CNF:
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_2
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_1
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_0
c  in DIMACS:
-13145  13146 -13147 -1020 -13148 0
-13145  13146 -13147 -1020 -13149 0
-13145  13146 -13147 -1020 -13150 0

c  0+1 --> 1
c    (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧  p_1020) -> (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0)
c  in CNF:
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_2
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_1
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨  b^{17, 61}_0
c  in DIMACS:
 13145  13146  13147 -1020 -13148 0
 13145  13146  13147 -1020 -13149 0
 13145  13146  13147 -1020  13150 0

c  1+1 --> 2
c    (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0 ∧  p_1020) -> (-b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0)
c  in CNF:
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_2
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨  b^{17, 61}_1
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ -p_1020 ∨ -b^{17, 61}_0
c  in DIMACS:
 13145  13146 -13147 -1020 -13148 0
 13145  13146 -13147 -1020  13149 0
 13145  13146 -13147 -1020 -13150 0

c  2+1 --> break 
c    (-b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 13145 -13146  13147 -1020 1162 0


c  2-1 --> 1
c    (-b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧ -p_1020) -> (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0)
c  in CNF:
c     b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_2
c     b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_1
c     b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨  b^{17, 61}_0
c  in DIMACS:
 13145 -13146  13147  1020 -13148 0
 13145 -13146  13147  1020 -13149 0
 13145 -13146  13147  1020  13150 0

c  1-1 --> 0
c    (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0 ∧ -p_1020) -> (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧ -b^{17, 61}_0)
c  in CNF:
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_2
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_1
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_0
c  in DIMACS:
 13145  13146 -13147  1020 -13148 0
 13145  13146 -13147  1020 -13149 0
 13145  13146 -13147  1020 -13150 0

c  0-1 --> -1
c    (-b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧ -p_1020) -> ( b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0)
c  in CNF:
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨  b^{17, 61}_2
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_1
c     b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨  b^{17, 61}_0
c  in DIMACS:
 13145  13146  13147  1020  13148 0
 13145  13146  13147  1020 -13149 0
 13145  13146  13147  1020  13150 0

c  -1-1 --> -2
c    ( b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧  b^{17, 60}_0 ∧ -p_1020) -> ( b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0)
c  in CNF:
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨  b^{17, 61}_2
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨  b^{17, 61}_1
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨  p_1020 ∨ -b^{17, 61}_0
c  in DIMACS:
-13145  13146 -13147  1020  13148 0
-13145  13146 -13147  1020  13149 0
-13145  13146 -13147  1020 -13150 0

c  -2-1 --> break 
c    ( b^{17, 60}_2 ∧  b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨  b^{17, 60}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-13145 -13146  13147  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 60}_2 ∧ -b^{17, 60}_1 ∧ -b^{17, 60}_0 ∧ true) 
c  in CNF:
c    -b^{17, 60}_2 ∨  b^{17, 60}_1 ∨  b^{17, 60}_0 ∨ false 
c  in DIMACS:
-13145  13146  13147  0

c  3 does not represent an automaton state.
c    -(-b^{17, 60}_2 ∧  b^{17, 60}_1 ∧  b^{17, 60}_0 ∧ true) 
c  in CNF:
c     b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ false 
c  in DIMACS:
 13145 -13146 -13147  0
c  -3 does not represent an automaton state.
c    -( b^{17, 60}_2 ∧  b^{17, 60}_1 ∧  b^{17, 60}_0 ∧ true) 
c  in CNF:
c    -b^{17, 60}_2 ∨ -b^{17, 60}_1 ∨ -b^{17, 60}_0 ∨ false 
c  in DIMACS:
-13145 -13146 -13147  0

c i = 61
c  -2+1 --> -1
c    ( b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧  p_1037) -> ( b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0)
c  in CNF:
c    -b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨  b^{17, 62}_2
c    -b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_1
c    -b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨  b^{17, 62}_0
c  in DIMACS:
-13148 -13149  13150 -1037  13151 0
-13148 -13149  13150 -1037 -13152 0
-13148 -13149  13150 -1037  13153 0

c  -1+1 --> 0
c    ( b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0 ∧  p_1037) -> (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧ -b^{17, 62}_0)
c  in CNF:
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_2
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_1
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_0
c  in DIMACS:
-13148  13149 -13150 -1037 -13151 0
-13148  13149 -13150 -1037 -13152 0
-13148  13149 -13150 -1037 -13153 0

c  0+1 --> 1
c    (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧  p_1037) -> (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0)
c  in CNF:
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_2
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_1
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨  b^{17, 62}_0
c  in DIMACS:
 13148  13149  13150 -1037 -13151 0
 13148  13149  13150 -1037 -13152 0
 13148  13149  13150 -1037  13153 0

c  1+1 --> 2
c    (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0 ∧  p_1037) -> (-b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0)
c  in CNF:
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_2
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨  b^{17, 62}_1
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ -p_1037 ∨ -b^{17, 62}_0
c  in DIMACS:
 13148  13149 -13150 -1037 -13151 0
 13148  13149 -13150 -1037  13152 0
 13148  13149 -13150 -1037 -13153 0

c  2+1 --> break 
c    (-b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧  p_1037) -> break
c  in CNF:
c     b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ -p_1037 ∨ break
c  in DIMACS:
 13148 -13149  13150 -1037 1162 0


c  2-1 --> 1
c    (-b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧ -p_1037) -> (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0)
c  in CNF:
c     b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_2
c     b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_1
c     b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨  b^{17, 62}_0
c  in DIMACS:
 13148 -13149  13150  1037 -13151 0
 13148 -13149  13150  1037 -13152 0
 13148 -13149  13150  1037  13153 0

c  1-1 --> 0
c    (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0 ∧ -p_1037) -> (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧ -b^{17, 62}_0)
c  in CNF:
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_2
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_1
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_0
c  in DIMACS:
 13148  13149 -13150  1037 -13151 0
 13148  13149 -13150  1037 -13152 0
 13148  13149 -13150  1037 -13153 0

c  0-1 --> -1
c    (-b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧ -p_1037) -> ( b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0)
c  in CNF:
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨  b^{17, 62}_2
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_1
c     b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨  b^{17, 62}_0
c  in DIMACS:
 13148  13149  13150  1037  13151 0
 13148  13149  13150  1037 -13152 0
 13148  13149  13150  1037  13153 0

c  -1-1 --> -2
c    ( b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧  b^{17, 61}_0 ∧ -p_1037) -> ( b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0)
c  in CNF:
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨  b^{17, 62}_2
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨  b^{17, 62}_1
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨  p_1037 ∨ -b^{17, 62}_0
c  in DIMACS:
-13148  13149 -13150  1037  13151 0
-13148  13149 -13150  1037  13152 0
-13148  13149 -13150  1037 -13153 0

c  -2-1 --> break 
c    ( b^{17, 61}_2 ∧  b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧ -p_1037) -> break
c  in CNF:
c    -b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨  b^{17, 61}_0 ∨  p_1037 ∨ break
c  in DIMACS:
-13148 -13149  13150  1037 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 61}_2 ∧ -b^{17, 61}_1 ∧ -b^{17, 61}_0 ∧ true) 
c  in CNF:
c    -b^{17, 61}_2 ∨  b^{17, 61}_1 ∨  b^{17, 61}_0 ∨ false 
c  in DIMACS:
-13148  13149  13150  0

c  3 does not represent an automaton state.
c    -(-b^{17, 61}_2 ∧  b^{17, 61}_1 ∧  b^{17, 61}_0 ∧ true) 
c  in CNF:
c     b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ false 
c  in DIMACS:
 13148 -13149 -13150  0
c  -3 does not represent an automaton state.
c    -( b^{17, 61}_2 ∧  b^{17, 61}_1 ∧  b^{17, 61}_0 ∧ true) 
c  in CNF:
c    -b^{17, 61}_2 ∨ -b^{17, 61}_1 ∨ -b^{17, 61}_0 ∨ false 
c  in DIMACS:
-13148 -13149 -13150  0

c i = 62
c  -2+1 --> -1
c    ( b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧  p_1054) -> ( b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0)
c  in CNF:
c    -b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨  b^{17, 63}_2
c    -b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_1
c    -b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨  b^{17, 63}_0
c  in DIMACS:
-13151 -13152  13153 -1054  13154 0
-13151 -13152  13153 -1054 -13155 0
-13151 -13152  13153 -1054  13156 0

c  -1+1 --> 0
c    ( b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0 ∧  p_1054) -> (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧ -b^{17, 63}_0)
c  in CNF:
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_2
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_1
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_0
c  in DIMACS:
-13151  13152 -13153 -1054 -13154 0
-13151  13152 -13153 -1054 -13155 0
-13151  13152 -13153 -1054 -13156 0

c  0+1 --> 1
c    (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧  p_1054) -> (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0)
c  in CNF:
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_2
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_1
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨  b^{17, 63}_0
c  in DIMACS:
 13151  13152  13153 -1054 -13154 0
 13151  13152  13153 -1054 -13155 0
 13151  13152  13153 -1054  13156 0

c  1+1 --> 2
c    (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0 ∧  p_1054) -> (-b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0)
c  in CNF:
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_2
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨  b^{17, 63}_1
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ -p_1054 ∨ -b^{17, 63}_0
c  in DIMACS:
 13151  13152 -13153 -1054 -13154 0
 13151  13152 -13153 -1054  13155 0
 13151  13152 -13153 -1054 -13156 0

c  2+1 --> break 
c    (-b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 13151 -13152  13153 -1054 1162 0


c  2-1 --> 1
c    (-b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧ -p_1054) -> (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0)
c  in CNF:
c     b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_2
c     b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_1
c     b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨  b^{17, 63}_0
c  in DIMACS:
 13151 -13152  13153  1054 -13154 0
 13151 -13152  13153  1054 -13155 0
 13151 -13152  13153  1054  13156 0

c  1-1 --> 0
c    (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0 ∧ -p_1054) -> (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧ -b^{17, 63}_0)
c  in CNF:
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_2
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_1
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_0
c  in DIMACS:
 13151  13152 -13153  1054 -13154 0
 13151  13152 -13153  1054 -13155 0
 13151  13152 -13153  1054 -13156 0

c  0-1 --> -1
c    (-b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧ -p_1054) -> ( b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0)
c  in CNF:
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨  b^{17, 63}_2
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_1
c     b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨  b^{17, 63}_0
c  in DIMACS:
 13151  13152  13153  1054  13154 0
 13151  13152  13153  1054 -13155 0
 13151  13152  13153  1054  13156 0

c  -1-1 --> -2
c    ( b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧  b^{17, 62}_0 ∧ -p_1054) -> ( b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0)
c  in CNF:
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨  b^{17, 63}_2
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨  b^{17, 63}_1
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨  p_1054 ∨ -b^{17, 63}_0
c  in DIMACS:
-13151  13152 -13153  1054  13154 0
-13151  13152 -13153  1054  13155 0
-13151  13152 -13153  1054 -13156 0

c  -2-1 --> break 
c    ( b^{17, 62}_2 ∧  b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨  b^{17, 62}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-13151 -13152  13153  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 62}_2 ∧ -b^{17, 62}_1 ∧ -b^{17, 62}_0 ∧ true) 
c  in CNF:
c    -b^{17, 62}_2 ∨  b^{17, 62}_1 ∨  b^{17, 62}_0 ∨ false 
c  in DIMACS:
-13151  13152  13153  0

c  3 does not represent an automaton state.
c    -(-b^{17, 62}_2 ∧  b^{17, 62}_1 ∧  b^{17, 62}_0 ∧ true) 
c  in CNF:
c     b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ false 
c  in DIMACS:
 13151 -13152 -13153  0
c  -3 does not represent an automaton state.
c    -( b^{17, 62}_2 ∧  b^{17, 62}_1 ∧  b^{17, 62}_0 ∧ true) 
c  in CNF:
c    -b^{17, 62}_2 ∨ -b^{17, 62}_1 ∨ -b^{17, 62}_0 ∨ false 
c  in DIMACS:
-13151 -13152 -13153  0

c i = 63
c  -2+1 --> -1
c    ( b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧  p_1071) -> ( b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0)
c  in CNF:
c    -b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨  b^{17, 64}_2
c    -b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_1
c    -b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨  b^{17, 64}_0
c  in DIMACS:
-13154 -13155  13156 -1071  13157 0
-13154 -13155  13156 -1071 -13158 0
-13154 -13155  13156 -1071  13159 0

c  -1+1 --> 0
c    ( b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0 ∧  p_1071) -> (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧ -b^{17, 64}_0)
c  in CNF:
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_2
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_1
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_0
c  in DIMACS:
-13154  13155 -13156 -1071 -13157 0
-13154  13155 -13156 -1071 -13158 0
-13154  13155 -13156 -1071 -13159 0

c  0+1 --> 1
c    (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧  p_1071) -> (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0)
c  in CNF:
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_2
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_1
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨  b^{17, 64}_0
c  in DIMACS:
 13154  13155  13156 -1071 -13157 0
 13154  13155  13156 -1071 -13158 0
 13154  13155  13156 -1071  13159 0

c  1+1 --> 2
c    (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0 ∧  p_1071) -> (-b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0)
c  in CNF:
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_2
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨  b^{17, 64}_1
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ -p_1071 ∨ -b^{17, 64}_0
c  in DIMACS:
 13154  13155 -13156 -1071 -13157 0
 13154  13155 -13156 -1071  13158 0
 13154  13155 -13156 -1071 -13159 0

c  2+1 --> break 
c    (-b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 13154 -13155  13156 -1071 1162 0


c  2-1 --> 1
c    (-b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧ -p_1071) -> (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0)
c  in CNF:
c     b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_2
c     b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_1
c     b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨  b^{17, 64}_0
c  in DIMACS:
 13154 -13155  13156  1071 -13157 0
 13154 -13155  13156  1071 -13158 0
 13154 -13155  13156  1071  13159 0

c  1-1 --> 0
c    (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0 ∧ -p_1071) -> (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧ -b^{17, 64}_0)
c  in CNF:
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_2
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_1
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_0
c  in DIMACS:
 13154  13155 -13156  1071 -13157 0
 13154  13155 -13156  1071 -13158 0
 13154  13155 -13156  1071 -13159 0

c  0-1 --> -1
c    (-b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧ -p_1071) -> ( b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0)
c  in CNF:
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨  b^{17, 64}_2
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_1
c     b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨  b^{17, 64}_0
c  in DIMACS:
 13154  13155  13156  1071  13157 0
 13154  13155  13156  1071 -13158 0
 13154  13155  13156  1071  13159 0

c  -1-1 --> -2
c    ( b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧  b^{17, 63}_0 ∧ -p_1071) -> ( b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0)
c  in CNF:
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨  b^{17, 64}_2
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨  b^{17, 64}_1
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨  p_1071 ∨ -b^{17, 64}_0
c  in DIMACS:
-13154  13155 -13156  1071  13157 0
-13154  13155 -13156  1071  13158 0
-13154  13155 -13156  1071 -13159 0

c  -2-1 --> break 
c    ( b^{17, 63}_2 ∧  b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨  b^{17, 63}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-13154 -13155  13156  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 63}_2 ∧ -b^{17, 63}_1 ∧ -b^{17, 63}_0 ∧ true) 
c  in CNF:
c    -b^{17, 63}_2 ∨  b^{17, 63}_1 ∨  b^{17, 63}_0 ∨ false 
c  in DIMACS:
-13154  13155  13156  0

c  3 does not represent an automaton state.
c    -(-b^{17, 63}_2 ∧  b^{17, 63}_1 ∧  b^{17, 63}_0 ∧ true) 
c  in CNF:
c     b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ false 
c  in DIMACS:
 13154 -13155 -13156  0
c  -3 does not represent an automaton state.
c    -( b^{17, 63}_2 ∧  b^{17, 63}_1 ∧  b^{17, 63}_0 ∧ true) 
c  in CNF:
c    -b^{17, 63}_2 ∨ -b^{17, 63}_1 ∨ -b^{17, 63}_0 ∨ false 
c  in DIMACS:
-13154 -13155 -13156  0

c i = 64
c  -2+1 --> -1
c    ( b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧  p_1088) -> ( b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0)
c  in CNF:
c    -b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨  b^{17, 65}_2
c    -b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_1
c    -b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨  b^{17, 65}_0
c  in DIMACS:
-13157 -13158  13159 -1088  13160 0
-13157 -13158  13159 -1088 -13161 0
-13157 -13158  13159 -1088  13162 0

c  -1+1 --> 0
c    ( b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0 ∧  p_1088) -> (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧ -b^{17, 65}_0)
c  in CNF:
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_2
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_1
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_0
c  in DIMACS:
-13157  13158 -13159 -1088 -13160 0
-13157  13158 -13159 -1088 -13161 0
-13157  13158 -13159 -1088 -13162 0

c  0+1 --> 1
c    (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧  p_1088) -> (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0)
c  in CNF:
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_2
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_1
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨  b^{17, 65}_0
c  in DIMACS:
 13157  13158  13159 -1088 -13160 0
 13157  13158  13159 -1088 -13161 0
 13157  13158  13159 -1088  13162 0

c  1+1 --> 2
c    (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0 ∧  p_1088) -> (-b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0)
c  in CNF:
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_2
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨  b^{17, 65}_1
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ -p_1088 ∨ -b^{17, 65}_0
c  in DIMACS:
 13157  13158 -13159 -1088 -13160 0
 13157  13158 -13159 -1088  13161 0
 13157  13158 -13159 -1088 -13162 0

c  2+1 --> break 
c    (-b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 13157 -13158  13159 -1088 1162 0


c  2-1 --> 1
c    (-b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧ -p_1088) -> (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0)
c  in CNF:
c     b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_2
c     b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_1
c     b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨  b^{17, 65}_0
c  in DIMACS:
 13157 -13158  13159  1088 -13160 0
 13157 -13158  13159  1088 -13161 0
 13157 -13158  13159  1088  13162 0

c  1-1 --> 0
c    (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0 ∧ -p_1088) -> (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧ -b^{17, 65}_0)
c  in CNF:
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_2
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_1
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_0
c  in DIMACS:
 13157  13158 -13159  1088 -13160 0
 13157  13158 -13159  1088 -13161 0
 13157  13158 -13159  1088 -13162 0

c  0-1 --> -1
c    (-b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧ -p_1088) -> ( b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0)
c  in CNF:
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨  b^{17, 65}_2
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_1
c     b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨  b^{17, 65}_0
c  in DIMACS:
 13157  13158  13159  1088  13160 0
 13157  13158  13159  1088 -13161 0
 13157  13158  13159  1088  13162 0

c  -1-1 --> -2
c    ( b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧  b^{17, 64}_0 ∧ -p_1088) -> ( b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0)
c  in CNF:
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨  b^{17, 65}_2
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨  b^{17, 65}_1
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨  p_1088 ∨ -b^{17, 65}_0
c  in DIMACS:
-13157  13158 -13159  1088  13160 0
-13157  13158 -13159  1088  13161 0
-13157  13158 -13159  1088 -13162 0

c  -2-1 --> break 
c    ( b^{17, 64}_2 ∧  b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨  b^{17, 64}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-13157 -13158  13159  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 64}_2 ∧ -b^{17, 64}_1 ∧ -b^{17, 64}_0 ∧ true) 
c  in CNF:
c    -b^{17, 64}_2 ∨  b^{17, 64}_1 ∨  b^{17, 64}_0 ∨ false 
c  in DIMACS:
-13157  13158  13159  0

c  3 does not represent an automaton state.
c    -(-b^{17, 64}_2 ∧  b^{17, 64}_1 ∧  b^{17, 64}_0 ∧ true) 
c  in CNF:
c     b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ false 
c  in DIMACS:
 13157 -13158 -13159  0
c  -3 does not represent an automaton state.
c    -( b^{17, 64}_2 ∧  b^{17, 64}_1 ∧  b^{17, 64}_0 ∧ true) 
c  in CNF:
c    -b^{17, 64}_2 ∨ -b^{17, 64}_1 ∨ -b^{17, 64}_0 ∨ false 
c  in DIMACS:
-13157 -13158 -13159  0

c i = 65
c  -2+1 --> -1
c    ( b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧  p_1105) -> ( b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0)
c  in CNF:
c    -b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨  b^{17, 66}_2
c    -b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_1
c    -b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨  b^{17, 66}_0
c  in DIMACS:
-13160 -13161  13162 -1105  13163 0
-13160 -13161  13162 -1105 -13164 0
-13160 -13161  13162 -1105  13165 0

c  -1+1 --> 0
c    ( b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0 ∧  p_1105) -> (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧ -b^{17, 66}_0)
c  in CNF:
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_2
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_1
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_0
c  in DIMACS:
-13160  13161 -13162 -1105 -13163 0
-13160  13161 -13162 -1105 -13164 0
-13160  13161 -13162 -1105 -13165 0

c  0+1 --> 1
c    (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧  p_1105) -> (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0)
c  in CNF:
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_2
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_1
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨  b^{17, 66}_0
c  in DIMACS:
 13160  13161  13162 -1105 -13163 0
 13160  13161  13162 -1105 -13164 0
 13160  13161  13162 -1105  13165 0

c  1+1 --> 2
c    (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0 ∧  p_1105) -> (-b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0)
c  in CNF:
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_2
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨  b^{17, 66}_1
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ -p_1105 ∨ -b^{17, 66}_0
c  in DIMACS:
 13160  13161 -13162 -1105 -13163 0
 13160  13161 -13162 -1105  13164 0
 13160  13161 -13162 -1105 -13165 0

c  2+1 --> break 
c    (-b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 13160 -13161  13162 -1105 1162 0


c  2-1 --> 1
c    (-b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧ -p_1105) -> (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0)
c  in CNF:
c     b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_2
c     b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_1
c     b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨  b^{17, 66}_0
c  in DIMACS:
 13160 -13161  13162  1105 -13163 0
 13160 -13161  13162  1105 -13164 0
 13160 -13161  13162  1105  13165 0

c  1-1 --> 0
c    (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0 ∧ -p_1105) -> (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧ -b^{17, 66}_0)
c  in CNF:
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_2
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_1
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_0
c  in DIMACS:
 13160  13161 -13162  1105 -13163 0
 13160  13161 -13162  1105 -13164 0
 13160  13161 -13162  1105 -13165 0

c  0-1 --> -1
c    (-b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧ -p_1105) -> ( b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0)
c  in CNF:
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨  b^{17, 66}_2
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_1
c     b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨  b^{17, 66}_0
c  in DIMACS:
 13160  13161  13162  1105  13163 0
 13160  13161  13162  1105 -13164 0
 13160  13161  13162  1105  13165 0

c  -1-1 --> -2
c    ( b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧  b^{17, 65}_0 ∧ -p_1105) -> ( b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0)
c  in CNF:
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨  b^{17, 66}_2
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨  b^{17, 66}_1
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨  p_1105 ∨ -b^{17, 66}_0
c  in DIMACS:
-13160  13161 -13162  1105  13163 0
-13160  13161 -13162  1105  13164 0
-13160  13161 -13162  1105 -13165 0

c  -2-1 --> break 
c    ( b^{17, 65}_2 ∧  b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨  b^{17, 65}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-13160 -13161  13162  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 65}_2 ∧ -b^{17, 65}_1 ∧ -b^{17, 65}_0 ∧ true) 
c  in CNF:
c    -b^{17, 65}_2 ∨  b^{17, 65}_1 ∨  b^{17, 65}_0 ∨ false 
c  in DIMACS:
-13160  13161  13162  0

c  3 does not represent an automaton state.
c    -(-b^{17, 65}_2 ∧  b^{17, 65}_1 ∧  b^{17, 65}_0 ∧ true) 
c  in CNF:
c     b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ false 
c  in DIMACS:
 13160 -13161 -13162  0
c  -3 does not represent an automaton state.
c    -( b^{17, 65}_2 ∧  b^{17, 65}_1 ∧  b^{17, 65}_0 ∧ true) 
c  in CNF:
c    -b^{17, 65}_2 ∨ -b^{17, 65}_1 ∨ -b^{17, 65}_0 ∨ false 
c  in DIMACS:
-13160 -13161 -13162  0

c i = 66
c  -2+1 --> -1
c    ( b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧  p_1122) -> ( b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0)
c  in CNF:
c    -b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨  b^{17, 67}_2
c    -b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_1
c    -b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨  b^{17, 67}_0
c  in DIMACS:
-13163 -13164  13165 -1122  13166 0
-13163 -13164  13165 -1122 -13167 0
-13163 -13164  13165 -1122  13168 0

c  -1+1 --> 0
c    ( b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0 ∧  p_1122) -> (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧ -b^{17, 67}_0)
c  in CNF:
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_2
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_1
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_0
c  in DIMACS:
-13163  13164 -13165 -1122 -13166 0
-13163  13164 -13165 -1122 -13167 0
-13163  13164 -13165 -1122 -13168 0

c  0+1 --> 1
c    (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧  p_1122) -> (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0)
c  in CNF:
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_2
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_1
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨  b^{17, 67}_0
c  in DIMACS:
 13163  13164  13165 -1122 -13166 0
 13163  13164  13165 -1122 -13167 0
 13163  13164  13165 -1122  13168 0

c  1+1 --> 2
c    (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0 ∧  p_1122) -> (-b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0)
c  in CNF:
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_2
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨  b^{17, 67}_1
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ -p_1122 ∨ -b^{17, 67}_0
c  in DIMACS:
 13163  13164 -13165 -1122 -13166 0
 13163  13164 -13165 -1122  13167 0
 13163  13164 -13165 -1122 -13168 0

c  2+1 --> break 
c    (-b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 13163 -13164  13165 -1122 1162 0


c  2-1 --> 1
c    (-b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧ -p_1122) -> (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0)
c  in CNF:
c     b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_2
c     b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_1
c     b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨  b^{17, 67}_0
c  in DIMACS:
 13163 -13164  13165  1122 -13166 0
 13163 -13164  13165  1122 -13167 0
 13163 -13164  13165  1122  13168 0

c  1-1 --> 0
c    (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0 ∧ -p_1122) -> (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧ -b^{17, 67}_0)
c  in CNF:
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_2
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_1
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_0
c  in DIMACS:
 13163  13164 -13165  1122 -13166 0
 13163  13164 -13165  1122 -13167 0
 13163  13164 -13165  1122 -13168 0

c  0-1 --> -1
c    (-b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧ -p_1122) -> ( b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0)
c  in CNF:
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨  b^{17, 67}_2
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_1
c     b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨  b^{17, 67}_0
c  in DIMACS:
 13163  13164  13165  1122  13166 0
 13163  13164  13165  1122 -13167 0
 13163  13164  13165  1122  13168 0

c  -1-1 --> -2
c    ( b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧  b^{17, 66}_0 ∧ -p_1122) -> ( b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0)
c  in CNF:
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨  b^{17, 67}_2
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨  b^{17, 67}_1
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨  p_1122 ∨ -b^{17, 67}_0
c  in DIMACS:
-13163  13164 -13165  1122  13166 0
-13163  13164 -13165  1122  13167 0
-13163  13164 -13165  1122 -13168 0

c  -2-1 --> break 
c    ( b^{17, 66}_2 ∧  b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨  b^{17, 66}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-13163 -13164  13165  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 66}_2 ∧ -b^{17, 66}_1 ∧ -b^{17, 66}_0 ∧ true) 
c  in CNF:
c    -b^{17, 66}_2 ∨  b^{17, 66}_1 ∨  b^{17, 66}_0 ∨ false 
c  in DIMACS:
-13163  13164  13165  0

c  3 does not represent an automaton state.
c    -(-b^{17, 66}_2 ∧  b^{17, 66}_1 ∧  b^{17, 66}_0 ∧ true) 
c  in CNF:
c     b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ false 
c  in DIMACS:
 13163 -13164 -13165  0
c  -3 does not represent an automaton state.
c    -( b^{17, 66}_2 ∧  b^{17, 66}_1 ∧  b^{17, 66}_0 ∧ true) 
c  in CNF:
c    -b^{17, 66}_2 ∨ -b^{17, 66}_1 ∨ -b^{17, 66}_0 ∨ false 
c  in DIMACS:
-13163 -13164 -13165  0

c i = 67
c  -2+1 --> -1
c    ( b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧  p_1139) -> ( b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0)
c  in CNF:
c    -b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨  b^{17, 68}_2
c    -b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_1
c    -b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨  b^{17, 68}_0
c  in DIMACS:
-13166 -13167  13168 -1139  13169 0
-13166 -13167  13168 -1139 -13170 0
-13166 -13167  13168 -1139  13171 0

c  -1+1 --> 0
c    ( b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0 ∧  p_1139) -> (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧ -b^{17, 68}_0)
c  in CNF:
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_2
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_1
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_0
c  in DIMACS:
-13166  13167 -13168 -1139 -13169 0
-13166  13167 -13168 -1139 -13170 0
-13166  13167 -13168 -1139 -13171 0

c  0+1 --> 1
c    (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧  p_1139) -> (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0)
c  in CNF:
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_2
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_1
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨  b^{17, 68}_0
c  in DIMACS:
 13166  13167  13168 -1139 -13169 0
 13166  13167  13168 -1139 -13170 0
 13166  13167  13168 -1139  13171 0

c  1+1 --> 2
c    (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0 ∧  p_1139) -> (-b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0)
c  in CNF:
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_2
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨  b^{17, 68}_1
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ -p_1139 ∨ -b^{17, 68}_0
c  in DIMACS:
 13166  13167 -13168 -1139 -13169 0
 13166  13167 -13168 -1139  13170 0
 13166  13167 -13168 -1139 -13171 0

c  2+1 --> break 
c    (-b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧  p_1139) -> break
c  in CNF:
c     b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ -p_1139 ∨ break
c  in DIMACS:
 13166 -13167  13168 -1139 1162 0


c  2-1 --> 1
c    (-b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧ -p_1139) -> (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0)
c  in CNF:
c     b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_2
c     b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_1
c     b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨  b^{17, 68}_0
c  in DIMACS:
 13166 -13167  13168  1139 -13169 0
 13166 -13167  13168  1139 -13170 0
 13166 -13167  13168  1139  13171 0

c  1-1 --> 0
c    (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0 ∧ -p_1139) -> (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧ -b^{17, 68}_0)
c  in CNF:
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_2
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_1
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_0
c  in DIMACS:
 13166  13167 -13168  1139 -13169 0
 13166  13167 -13168  1139 -13170 0
 13166  13167 -13168  1139 -13171 0

c  0-1 --> -1
c    (-b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧ -p_1139) -> ( b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0)
c  in CNF:
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨  b^{17, 68}_2
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_1
c     b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨  b^{17, 68}_0
c  in DIMACS:
 13166  13167  13168  1139  13169 0
 13166  13167  13168  1139 -13170 0
 13166  13167  13168  1139  13171 0

c  -1-1 --> -2
c    ( b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧  b^{17, 67}_0 ∧ -p_1139) -> ( b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0)
c  in CNF:
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨  b^{17, 68}_2
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨  b^{17, 68}_1
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨  p_1139 ∨ -b^{17, 68}_0
c  in DIMACS:
-13166  13167 -13168  1139  13169 0
-13166  13167 -13168  1139  13170 0
-13166  13167 -13168  1139 -13171 0

c  -2-1 --> break 
c    ( b^{17, 67}_2 ∧  b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧ -p_1139) -> break
c  in CNF:
c    -b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨  b^{17, 67}_0 ∨  p_1139 ∨ break
c  in DIMACS:
-13166 -13167  13168  1139 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 67}_2 ∧ -b^{17, 67}_1 ∧ -b^{17, 67}_0 ∧ true) 
c  in CNF:
c    -b^{17, 67}_2 ∨  b^{17, 67}_1 ∨  b^{17, 67}_0 ∨ false 
c  in DIMACS:
-13166  13167  13168  0

c  3 does not represent an automaton state.
c    -(-b^{17, 67}_2 ∧  b^{17, 67}_1 ∧  b^{17, 67}_0 ∧ true) 
c  in CNF:
c     b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ false 
c  in DIMACS:
 13166 -13167 -13168  0
c  -3 does not represent an automaton state.
c    -( b^{17, 67}_2 ∧  b^{17, 67}_1 ∧  b^{17, 67}_0 ∧ true) 
c  in CNF:
c    -b^{17, 67}_2 ∨ -b^{17, 67}_1 ∨ -b^{17, 67}_0 ∨ false 
c  in DIMACS:
-13166 -13167 -13168  0

c i = 68
c  -2+1 --> -1
c    ( b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧  p_1156) -> ( b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧  b^{17, 69}_0)
c  in CNF:
c    -b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨  b^{17, 69}_2
c    -b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_1
c    -b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨  b^{17, 69}_0
c  in DIMACS:
-13169 -13170  13171 -1156  13172 0
-13169 -13170  13171 -1156 -13173 0
-13169 -13170  13171 -1156  13174 0

c  -1+1 --> 0
c    ( b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0 ∧  p_1156) -> (-b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧ -b^{17, 69}_0)
c  in CNF:
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_2
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_1
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_0
c  in DIMACS:
-13169  13170 -13171 -1156 -13172 0
-13169  13170 -13171 -1156 -13173 0
-13169  13170 -13171 -1156 -13174 0

c  0+1 --> 1
c    (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧  p_1156) -> (-b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧  b^{17, 69}_0)
c  in CNF:
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_2
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_1
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨  b^{17, 69}_0
c  in DIMACS:
 13169  13170  13171 -1156 -13172 0
 13169  13170  13171 -1156 -13173 0
 13169  13170  13171 -1156  13174 0

c  1+1 --> 2
c    (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0 ∧  p_1156) -> (-b^{17, 69}_2 ∧  b^{17, 69}_1 ∧ -b^{17, 69}_0)
c  in CNF:
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_2
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨  b^{17, 69}_1
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ -p_1156 ∨ -b^{17, 69}_0
c  in DIMACS:
 13169  13170 -13171 -1156 -13172 0
 13169  13170 -13171 -1156  13173 0
 13169  13170 -13171 -1156 -13174 0

c  2+1 --> break 
c    (-b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 13169 -13170  13171 -1156 1162 0


c  2-1 --> 1
c    (-b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧ -p_1156) -> (-b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧  b^{17, 69}_0)
c  in CNF:
c     b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_2
c     b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_1
c     b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨  b^{17, 69}_0
c  in DIMACS:
 13169 -13170  13171  1156 -13172 0
 13169 -13170  13171  1156 -13173 0
 13169 -13170  13171  1156  13174 0

c  1-1 --> 0
c    (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0 ∧ -p_1156) -> (-b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧ -b^{17, 69}_0)
c  in CNF:
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_2
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_1
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_0
c  in DIMACS:
 13169  13170 -13171  1156 -13172 0
 13169  13170 -13171  1156 -13173 0
 13169  13170 -13171  1156 -13174 0

c  0-1 --> -1
c    (-b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧ -p_1156) -> ( b^{17, 69}_2 ∧ -b^{17, 69}_1 ∧  b^{17, 69}_0)
c  in CNF:
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨  b^{17, 69}_2
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_1
c     b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨  b^{17, 69}_0
c  in DIMACS:
 13169  13170  13171  1156  13172 0
 13169  13170  13171  1156 -13173 0
 13169  13170  13171  1156  13174 0

c  -1-1 --> -2
c    ( b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧  b^{17, 68}_0 ∧ -p_1156) -> ( b^{17, 69}_2 ∧  b^{17, 69}_1 ∧ -b^{17, 69}_0)
c  in CNF:
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨  b^{17, 69}_2
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨  b^{17, 69}_1
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨  p_1156 ∨ -b^{17, 69}_0
c  in DIMACS:
-13169  13170 -13171  1156  13172 0
-13169  13170 -13171  1156  13173 0
-13169  13170 -13171  1156 -13174 0

c  -2-1 --> break 
c    ( b^{17, 68}_2 ∧  b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨  b^{17, 68}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-13169 -13170  13171  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{17, 68}_2 ∧ -b^{17, 68}_1 ∧ -b^{17, 68}_0 ∧ true) 
c  in CNF:
c    -b^{17, 68}_2 ∨  b^{17, 68}_1 ∨  b^{17, 68}_0 ∨ false 
c  in DIMACS:
-13169  13170  13171  0

c  3 does not represent an automaton state.
c    -(-b^{17, 68}_2 ∧  b^{17, 68}_1 ∧  b^{17, 68}_0 ∧ true) 
c  in CNF:
c     b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ false 
c  in DIMACS:
 13169 -13170 -13171  0
c  -3 does not represent an automaton state.
c    -( b^{17, 68}_2 ∧  b^{17, 68}_1 ∧  b^{17, 68}_0 ∧ true) 
c  in CNF:
c    -b^{17, 68}_2 ∨ -b^{17, 68}_1 ∨ -b^{17, 68}_0 ∨ false 
c  in DIMACS:
-13169 -13170 -13171  0

c INIT for k = 18
c    -b^{18, 1}_2
c    -b^{18, 1}_1
c    -b^{18, 1}_0
c  in DIMACS:
-13175 0
-13176 0
-13177 0

c Transitions for k = 18
c i = 1
c  -2+1 --> -1
c    ( b^{18, 1}_2 ∧  b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧  p_18) -> ( b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0)
c  in CNF:
c    -b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨  b^{18, 2}_2
c    -b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_1
c    -b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨  b^{18, 2}_0
c  in DIMACS:
-13175 -13176  13177 -18  13178 0
-13175 -13176  13177 -18 -13179 0
-13175 -13176  13177 -18  13180 0

c  -1+1 --> 0
c    ( b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧  b^{18, 1}_0 ∧  p_18) -> (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧ -b^{18, 2}_0)
c  in CNF:
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_2
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_1
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_0
c  in DIMACS:
-13175  13176 -13177 -18 -13178 0
-13175  13176 -13177 -18 -13179 0
-13175  13176 -13177 -18 -13180 0

c  0+1 --> 1
c    (-b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧  p_18) -> (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0)
c  in CNF:
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_2
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_1
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨  b^{18, 2}_0
c  in DIMACS:
 13175  13176  13177 -18 -13178 0
 13175  13176  13177 -18 -13179 0
 13175  13176  13177 -18  13180 0

c  1+1 --> 2
c    (-b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧  b^{18, 1}_0 ∧  p_18) -> (-b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0)
c  in CNF:
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_2
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨  b^{18, 2}_1
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ -p_18 ∨ -b^{18, 2}_0
c  in DIMACS:
 13175  13176 -13177 -18 -13178 0
 13175  13176 -13177 -18  13179 0
 13175  13176 -13177 -18 -13180 0

c  2+1 --> break 
c    (-b^{18, 1}_2 ∧  b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧  p_18) -> break
c  in CNF:
c     b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ -p_18 ∨ break
c  in DIMACS:
 13175 -13176  13177 -18 1162 0


c  2-1 --> 1
c    (-b^{18, 1}_2 ∧  b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧ -p_18) -> (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0)
c  in CNF:
c     b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_2
c     b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_1
c     b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨  b^{18, 2}_0
c  in DIMACS:
 13175 -13176  13177  18 -13178 0
 13175 -13176  13177  18 -13179 0
 13175 -13176  13177  18  13180 0

c  1-1 --> 0
c    (-b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧  b^{18, 1}_0 ∧ -p_18) -> (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧ -b^{18, 2}_0)
c  in CNF:
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_2
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_1
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_0
c  in DIMACS:
 13175  13176 -13177  18 -13178 0
 13175  13176 -13177  18 -13179 0
 13175  13176 -13177  18 -13180 0

c  0-1 --> -1
c    (-b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧ -p_18) -> ( b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0)
c  in CNF:
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨  b^{18, 2}_2
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_1
c     b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨  b^{18, 2}_0
c  in DIMACS:
 13175  13176  13177  18  13178 0
 13175  13176  13177  18 -13179 0
 13175  13176  13177  18  13180 0

c  -1-1 --> -2
c    ( b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧  b^{18, 1}_0 ∧ -p_18) -> ( b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0)
c  in CNF:
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨  b^{18, 2}_2
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨  b^{18, 2}_1
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨  p_18 ∨ -b^{18, 2}_0
c  in DIMACS:
-13175  13176 -13177  18  13178 0
-13175  13176 -13177  18  13179 0
-13175  13176 -13177  18 -13180 0

c  -2-1 --> break 
c    ( b^{18, 1}_2 ∧  b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧ -p_18) -> break
c  in CNF:
c    -b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨  b^{18, 1}_0 ∨  p_18 ∨ break
c  in DIMACS:
-13175 -13176  13177  18 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 1}_2 ∧ -b^{18, 1}_1 ∧ -b^{18, 1}_0 ∧ true) 
c  in CNF:
c    -b^{18, 1}_2 ∨  b^{18, 1}_1 ∨  b^{18, 1}_0 ∨ false 
c  in DIMACS:
-13175  13176  13177  0

c  3 does not represent an automaton state.
c    -(-b^{18, 1}_2 ∧  b^{18, 1}_1 ∧  b^{18, 1}_0 ∧ true) 
c  in CNF:
c     b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ false 
c  in DIMACS:
 13175 -13176 -13177  0
c  -3 does not represent an automaton state.
c    -( b^{18, 1}_2 ∧  b^{18, 1}_1 ∧  b^{18, 1}_0 ∧ true) 
c  in CNF:
c    -b^{18, 1}_2 ∨ -b^{18, 1}_1 ∨ -b^{18, 1}_0 ∨ false 
c  in DIMACS:
-13175 -13176 -13177  0

c i = 2
c  -2+1 --> -1
c    ( b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧  p_36) -> ( b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0)
c  in CNF:
c    -b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨  b^{18, 3}_2
c    -b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_1
c    -b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨  b^{18, 3}_0
c  in DIMACS:
-13178 -13179  13180 -36  13181 0
-13178 -13179  13180 -36 -13182 0
-13178 -13179  13180 -36  13183 0

c  -1+1 --> 0
c    ( b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0 ∧  p_36) -> (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧ -b^{18, 3}_0)
c  in CNF:
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_2
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_1
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_0
c  in DIMACS:
-13178  13179 -13180 -36 -13181 0
-13178  13179 -13180 -36 -13182 0
-13178  13179 -13180 -36 -13183 0

c  0+1 --> 1
c    (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧  p_36) -> (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0)
c  in CNF:
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_2
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_1
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨  b^{18, 3}_0
c  in DIMACS:
 13178  13179  13180 -36 -13181 0
 13178  13179  13180 -36 -13182 0
 13178  13179  13180 -36  13183 0

c  1+1 --> 2
c    (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0 ∧  p_36) -> (-b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0)
c  in CNF:
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_2
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨  b^{18, 3}_1
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ -p_36 ∨ -b^{18, 3}_0
c  in DIMACS:
 13178  13179 -13180 -36 -13181 0
 13178  13179 -13180 -36  13182 0
 13178  13179 -13180 -36 -13183 0

c  2+1 --> break 
c    (-b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧  p_36) -> break
c  in CNF:
c     b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 13178 -13179  13180 -36 1162 0


c  2-1 --> 1
c    (-b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧ -p_36) -> (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0)
c  in CNF:
c     b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_2
c     b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_1
c     b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨  b^{18, 3}_0
c  in DIMACS:
 13178 -13179  13180  36 -13181 0
 13178 -13179  13180  36 -13182 0
 13178 -13179  13180  36  13183 0

c  1-1 --> 0
c    (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0 ∧ -p_36) -> (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧ -b^{18, 3}_0)
c  in CNF:
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_2
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_1
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_0
c  in DIMACS:
 13178  13179 -13180  36 -13181 0
 13178  13179 -13180  36 -13182 0
 13178  13179 -13180  36 -13183 0

c  0-1 --> -1
c    (-b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧ -p_36) -> ( b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0)
c  in CNF:
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨  b^{18, 3}_2
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_1
c     b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨  b^{18, 3}_0
c  in DIMACS:
 13178  13179  13180  36  13181 0
 13178  13179  13180  36 -13182 0
 13178  13179  13180  36  13183 0

c  -1-1 --> -2
c    ( b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧  b^{18, 2}_0 ∧ -p_36) -> ( b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0)
c  in CNF:
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨  b^{18, 3}_2
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨  b^{18, 3}_1
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨  p_36 ∨ -b^{18, 3}_0
c  in DIMACS:
-13178  13179 -13180  36  13181 0
-13178  13179 -13180  36  13182 0
-13178  13179 -13180  36 -13183 0

c  -2-1 --> break 
c    ( b^{18, 2}_2 ∧  b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨  b^{18, 2}_0 ∨  p_36 ∨ break
c  in DIMACS:
-13178 -13179  13180  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 2}_2 ∧ -b^{18, 2}_1 ∧ -b^{18, 2}_0 ∧ true) 
c  in CNF:
c    -b^{18, 2}_2 ∨  b^{18, 2}_1 ∨  b^{18, 2}_0 ∨ false 
c  in DIMACS:
-13178  13179  13180  0

c  3 does not represent an automaton state.
c    -(-b^{18, 2}_2 ∧  b^{18, 2}_1 ∧  b^{18, 2}_0 ∧ true) 
c  in CNF:
c     b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ false 
c  in DIMACS:
 13178 -13179 -13180  0
c  -3 does not represent an automaton state.
c    -( b^{18, 2}_2 ∧  b^{18, 2}_1 ∧  b^{18, 2}_0 ∧ true) 
c  in CNF:
c    -b^{18, 2}_2 ∨ -b^{18, 2}_1 ∨ -b^{18, 2}_0 ∨ false 
c  in DIMACS:
-13178 -13179 -13180  0

c i = 3
c  -2+1 --> -1
c    ( b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧  p_54) -> ( b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0)
c  in CNF:
c    -b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨  b^{18, 4}_2
c    -b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_1
c    -b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨  b^{18, 4}_0
c  in DIMACS:
-13181 -13182  13183 -54  13184 0
-13181 -13182  13183 -54 -13185 0
-13181 -13182  13183 -54  13186 0

c  -1+1 --> 0
c    ( b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0 ∧  p_54) -> (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧ -b^{18, 4}_0)
c  in CNF:
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_2
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_1
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_0
c  in DIMACS:
-13181  13182 -13183 -54 -13184 0
-13181  13182 -13183 -54 -13185 0
-13181  13182 -13183 -54 -13186 0

c  0+1 --> 1
c    (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧  p_54) -> (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0)
c  in CNF:
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_2
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_1
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨  b^{18, 4}_0
c  in DIMACS:
 13181  13182  13183 -54 -13184 0
 13181  13182  13183 -54 -13185 0
 13181  13182  13183 -54  13186 0

c  1+1 --> 2
c    (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0 ∧  p_54) -> (-b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0)
c  in CNF:
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_2
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨  b^{18, 4}_1
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ -p_54 ∨ -b^{18, 4}_0
c  in DIMACS:
 13181  13182 -13183 -54 -13184 0
 13181  13182 -13183 -54  13185 0
 13181  13182 -13183 -54 -13186 0

c  2+1 --> break 
c    (-b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧  p_54) -> break
c  in CNF:
c     b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 13181 -13182  13183 -54 1162 0


c  2-1 --> 1
c    (-b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧ -p_54) -> (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0)
c  in CNF:
c     b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_2
c     b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_1
c     b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨  b^{18, 4}_0
c  in DIMACS:
 13181 -13182  13183  54 -13184 0
 13181 -13182  13183  54 -13185 0
 13181 -13182  13183  54  13186 0

c  1-1 --> 0
c    (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0 ∧ -p_54) -> (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧ -b^{18, 4}_0)
c  in CNF:
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_2
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_1
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_0
c  in DIMACS:
 13181  13182 -13183  54 -13184 0
 13181  13182 -13183  54 -13185 0
 13181  13182 -13183  54 -13186 0

c  0-1 --> -1
c    (-b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧ -p_54) -> ( b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0)
c  in CNF:
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨  b^{18, 4}_2
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_1
c     b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨  b^{18, 4}_0
c  in DIMACS:
 13181  13182  13183  54  13184 0
 13181  13182  13183  54 -13185 0
 13181  13182  13183  54  13186 0

c  -1-1 --> -2
c    ( b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧  b^{18, 3}_0 ∧ -p_54) -> ( b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0)
c  in CNF:
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨  b^{18, 4}_2
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨  b^{18, 4}_1
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨  p_54 ∨ -b^{18, 4}_0
c  in DIMACS:
-13181  13182 -13183  54  13184 0
-13181  13182 -13183  54  13185 0
-13181  13182 -13183  54 -13186 0

c  -2-1 --> break 
c    ( b^{18, 3}_2 ∧  b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨  b^{18, 3}_0 ∨  p_54 ∨ break
c  in DIMACS:
-13181 -13182  13183  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 3}_2 ∧ -b^{18, 3}_1 ∧ -b^{18, 3}_0 ∧ true) 
c  in CNF:
c    -b^{18, 3}_2 ∨  b^{18, 3}_1 ∨  b^{18, 3}_0 ∨ false 
c  in DIMACS:
-13181  13182  13183  0

c  3 does not represent an automaton state.
c    -(-b^{18, 3}_2 ∧  b^{18, 3}_1 ∧  b^{18, 3}_0 ∧ true) 
c  in CNF:
c     b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ false 
c  in DIMACS:
 13181 -13182 -13183  0
c  -3 does not represent an automaton state.
c    -( b^{18, 3}_2 ∧  b^{18, 3}_1 ∧  b^{18, 3}_0 ∧ true) 
c  in CNF:
c    -b^{18, 3}_2 ∨ -b^{18, 3}_1 ∨ -b^{18, 3}_0 ∨ false 
c  in DIMACS:
-13181 -13182 -13183  0

c i = 4
c  -2+1 --> -1
c    ( b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧  p_72) -> ( b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0)
c  in CNF:
c    -b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨  b^{18, 5}_2
c    -b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_1
c    -b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨  b^{18, 5}_0
c  in DIMACS:
-13184 -13185  13186 -72  13187 0
-13184 -13185  13186 -72 -13188 0
-13184 -13185  13186 -72  13189 0

c  -1+1 --> 0
c    ( b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0 ∧  p_72) -> (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧ -b^{18, 5}_0)
c  in CNF:
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_2
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_1
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_0
c  in DIMACS:
-13184  13185 -13186 -72 -13187 0
-13184  13185 -13186 -72 -13188 0
-13184  13185 -13186 -72 -13189 0

c  0+1 --> 1
c    (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧  p_72) -> (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0)
c  in CNF:
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_2
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_1
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨  b^{18, 5}_0
c  in DIMACS:
 13184  13185  13186 -72 -13187 0
 13184  13185  13186 -72 -13188 0
 13184  13185  13186 -72  13189 0

c  1+1 --> 2
c    (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0 ∧  p_72) -> (-b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0)
c  in CNF:
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_2
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨  b^{18, 5}_1
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ -p_72 ∨ -b^{18, 5}_0
c  in DIMACS:
 13184  13185 -13186 -72 -13187 0
 13184  13185 -13186 -72  13188 0
 13184  13185 -13186 -72 -13189 0

c  2+1 --> break 
c    (-b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧  p_72) -> break
c  in CNF:
c     b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 13184 -13185  13186 -72 1162 0


c  2-1 --> 1
c    (-b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧ -p_72) -> (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0)
c  in CNF:
c     b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_2
c     b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_1
c     b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨  b^{18, 5}_0
c  in DIMACS:
 13184 -13185  13186  72 -13187 0
 13184 -13185  13186  72 -13188 0
 13184 -13185  13186  72  13189 0

c  1-1 --> 0
c    (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0 ∧ -p_72) -> (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧ -b^{18, 5}_0)
c  in CNF:
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_2
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_1
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_0
c  in DIMACS:
 13184  13185 -13186  72 -13187 0
 13184  13185 -13186  72 -13188 0
 13184  13185 -13186  72 -13189 0

c  0-1 --> -1
c    (-b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧ -p_72) -> ( b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0)
c  in CNF:
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨  b^{18, 5}_2
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_1
c     b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨  b^{18, 5}_0
c  in DIMACS:
 13184  13185  13186  72  13187 0
 13184  13185  13186  72 -13188 0
 13184  13185  13186  72  13189 0

c  -1-1 --> -2
c    ( b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧  b^{18, 4}_0 ∧ -p_72) -> ( b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0)
c  in CNF:
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨  b^{18, 5}_2
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨  b^{18, 5}_1
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨  p_72 ∨ -b^{18, 5}_0
c  in DIMACS:
-13184  13185 -13186  72  13187 0
-13184  13185 -13186  72  13188 0
-13184  13185 -13186  72 -13189 0

c  -2-1 --> break 
c    ( b^{18, 4}_2 ∧  b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨  b^{18, 4}_0 ∨  p_72 ∨ break
c  in DIMACS:
-13184 -13185  13186  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 4}_2 ∧ -b^{18, 4}_1 ∧ -b^{18, 4}_0 ∧ true) 
c  in CNF:
c    -b^{18, 4}_2 ∨  b^{18, 4}_1 ∨  b^{18, 4}_0 ∨ false 
c  in DIMACS:
-13184  13185  13186  0

c  3 does not represent an automaton state.
c    -(-b^{18, 4}_2 ∧  b^{18, 4}_1 ∧  b^{18, 4}_0 ∧ true) 
c  in CNF:
c     b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ false 
c  in DIMACS:
 13184 -13185 -13186  0
c  -3 does not represent an automaton state.
c    -( b^{18, 4}_2 ∧  b^{18, 4}_1 ∧  b^{18, 4}_0 ∧ true) 
c  in CNF:
c    -b^{18, 4}_2 ∨ -b^{18, 4}_1 ∨ -b^{18, 4}_0 ∨ false 
c  in DIMACS:
-13184 -13185 -13186  0

c i = 5
c  -2+1 --> -1
c    ( b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧  p_90) -> ( b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0)
c  in CNF:
c    -b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨  b^{18, 6}_2
c    -b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_1
c    -b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨  b^{18, 6}_0
c  in DIMACS:
-13187 -13188  13189 -90  13190 0
-13187 -13188  13189 -90 -13191 0
-13187 -13188  13189 -90  13192 0

c  -1+1 --> 0
c    ( b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0 ∧  p_90) -> (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧ -b^{18, 6}_0)
c  in CNF:
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_2
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_1
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_0
c  in DIMACS:
-13187  13188 -13189 -90 -13190 0
-13187  13188 -13189 -90 -13191 0
-13187  13188 -13189 -90 -13192 0

c  0+1 --> 1
c    (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧  p_90) -> (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0)
c  in CNF:
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_2
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_1
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨  b^{18, 6}_0
c  in DIMACS:
 13187  13188  13189 -90 -13190 0
 13187  13188  13189 -90 -13191 0
 13187  13188  13189 -90  13192 0

c  1+1 --> 2
c    (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0 ∧  p_90) -> (-b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0)
c  in CNF:
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_2
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨  b^{18, 6}_1
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ -p_90 ∨ -b^{18, 6}_0
c  in DIMACS:
 13187  13188 -13189 -90 -13190 0
 13187  13188 -13189 -90  13191 0
 13187  13188 -13189 -90 -13192 0

c  2+1 --> break 
c    (-b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧  p_90) -> break
c  in CNF:
c     b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 13187 -13188  13189 -90 1162 0


c  2-1 --> 1
c    (-b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧ -p_90) -> (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0)
c  in CNF:
c     b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_2
c     b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_1
c     b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨  b^{18, 6}_0
c  in DIMACS:
 13187 -13188  13189  90 -13190 0
 13187 -13188  13189  90 -13191 0
 13187 -13188  13189  90  13192 0

c  1-1 --> 0
c    (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0 ∧ -p_90) -> (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧ -b^{18, 6}_0)
c  in CNF:
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_2
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_1
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_0
c  in DIMACS:
 13187  13188 -13189  90 -13190 0
 13187  13188 -13189  90 -13191 0
 13187  13188 -13189  90 -13192 0

c  0-1 --> -1
c    (-b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧ -p_90) -> ( b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0)
c  in CNF:
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨  b^{18, 6}_2
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_1
c     b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨  b^{18, 6}_0
c  in DIMACS:
 13187  13188  13189  90  13190 0
 13187  13188  13189  90 -13191 0
 13187  13188  13189  90  13192 0

c  -1-1 --> -2
c    ( b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧  b^{18, 5}_0 ∧ -p_90) -> ( b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0)
c  in CNF:
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨  b^{18, 6}_2
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨  b^{18, 6}_1
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨  p_90 ∨ -b^{18, 6}_0
c  in DIMACS:
-13187  13188 -13189  90  13190 0
-13187  13188 -13189  90  13191 0
-13187  13188 -13189  90 -13192 0

c  -2-1 --> break 
c    ( b^{18, 5}_2 ∧  b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨  b^{18, 5}_0 ∨  p_90 ∨ break
c  in DIMACS:
-13187 -13188  13189  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 5}_2 ∧ -b^{18, 5}_1 ∧ -b^{18, 5}_0 ∧ true) 
c  in CNF:
c    -b^{18, 5}_2 ∨  b^{18, 5}_1 ∨  b^{18, 5}_0 ∨ false 
c  in DIMACS:
-13187  13188  13189  0

c  3 does not represent an automaton state.
c    -(-b^{18, 5}_2 ∧  b^{18, 5}_1 ∧  b^{18, 5}_0 ∧ true) 
c  in CNF:
c     b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ false 
c  in DIMACS:
 13187 -13188 -13189  0
c  -3 does not represent an automaton state.
c    -( b^{18, 5}_2 ∧  b^{18, 5}_1 ∧  b^{18, 5}_0 ∧ true) 
c  in CNF:
c    -b^{18, 5}_2 ∨ -b^{18, 5}_1 ∨ -b^{18, 5}_0 ∨ false 
c  in DIMACS:
-13187 -13188 -13189  0

c i = 6
c  -2+1 --> -1
c    ( b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧  p_108) -> ( b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0)
c  in CNF:
c    -b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨  b^{18, 7}_2
c    -b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_1
c    -b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨  b^{18, 7}_0
c  in DIMACS:
-13190 -13191  13192 -108  13193 0
-13190 -13191  13192 -108 -13194 0
-13190 -13191  13192 -108  13195 0

c  -1+1 --> 0
c    ( b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0 ∧  p_108) -> (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧ -b^{18, 7}_0)
c  in CNF:
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_2
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_1
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_0
c  in DIMACS:
-13190  13191 -13192 -108 -13193 0
-13190  13191 -13192 -108 -13194 0
-13190  13191 -13192 -108 -13195 0

c  0+1 --> 1
c    (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧  p_108) -> (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0)
c  in CNF:
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_2
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_1
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨  b^{18, 7}_0
c  in DIMACS:
 13190  13191  13192 -108 -13193 0
 13190  13191  13192 -108 -13194 0
 13190  13191  13192 -108  13195 0

c  1+1 --> 2
c    (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0 ∧  p_108) -> (-b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0)
c  in CNF:
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_2
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨  b^{18, 7}_1
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ -p_108 ∨ -b^{18, 7}_0
c  in DIMACS:
 13190  13191 -13192 -108 -13193 0
 13190  13191 -13192 -108  13194 0
 13190  13191 -13192 -108 -13195 0

c  2+1 --> break 
c    (-b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧  p_108) -> break
c  in CNF:
c     b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 13190 -13191  13192 -108 1162 0


c  2-1 --> 1
c    (-b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧ -p_108) -> (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0)
c  in CNF:
c     b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_2
c     b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_1
c     b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨  b^{18, 7}_0
c  in DIMACS:
 13190 -13191  13192  108 -13193 0
 13190 -13191  13192  108 -13194 0
 13190 -13191  13192  108  13195 0

c  1-1 --> 0
c    (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0 ∧ -p_108) -> (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧ -b^{18, 7}_0)
c  in CNF:
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_2
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_1
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_0
c  in DIMACS:
 13190  13191 -13192  108 -13193 0
 13190  13191 -13192  108 -13194 0
 13190  13191 -13192  108 -13195 0

c  0-1 --> -1
c    (-b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧ -p_108) -> ( b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0)
c  in CNF:
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨  b^{18, 7}_2
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_1
c     b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨  b^{18, 7}_0
c  in DIMACS:
 13190  13191  13192  108  13193 0
 13190  13191  13192  108 -13194 0
 13190  13191  13192  108  13195 0

c  -1-1 --> -2
c    ( b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧  b^{18, 6}_0 ∧ -p_108) -> ( b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0)
c  in CNF:
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨  b^{18, 7}_2
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨  b^{18, 7}_1
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨  p_108 ∨ -b^{18, 7}_0
c  in DIMACS:
-13190  13191 -13192  108  13193 0
-13190  13191 -13192  108  13194 0
-13190  13191 -13192  108 -13195 0

c  -2-1 --> break 
c    ( b^{18, 6}_2 ∧  b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨  b^{18, 6}_0 ∨  p_108 ∨ break
c  in DIMACS:
-13190 -13191  13192  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 6}_2 ∧ -b^{18, 6}_1 ∧ -b^{18, 6}_0 ∧ true) 
c  in CNF:
c    -b^{18, 6}_2 ∨  b^{18, 6}_1 ∨  b^{18, 6}_0 ∨ false 
c  in DIMACS:
-13190  13191  13192  0

c  3 does not represent an automaton state.
c    -(-b^{18, 6}_2 ∧  b^{18, 6}_1 ∧  b^{18, 6}_0 ∧ true) 
c  in CNF:
c     b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ false 
c  in DIMACS:
 13190 -13191 -13192  0
c  -3 does not represent an automaton state.
c    -( b^{18, 6}_2 ∧  b^{18, 6}_1 ∧  b^{18, 6}_0 ∧ true) 
c  in CNF:
c    -b^{18, 6}_2 ∨ -b^{18, 6}_1 ∨ -b^{18, 6}_0 ∨ false 
c  in DIMACS:
-13190 -13191 -13192  0

c i = 7
c  -2+1 --> -1
c    ( b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧  p_126) -> ( b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0)
c  in CNF:
c    -b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨  b^{18, 8}_2
c    -b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_1
c    -b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨  b^{18, 8}_0
c  in DIMACS:
-13193 -13194  13195 -126  13196 0
-13193 -13194  13195 -126 -13197 0
-13193 -13194  13195 -126  13198 0

c  -1+1 --> 0
c    ( b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0 ∧  p_126) -> (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧ -b^{18, 8}_0)
c  in CNF:
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_2
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_1
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_0
c  in DIMACS:
-13193  13194 -13195 -126 -13196 0
-13193  13194 -13195 -126 -13197 0
-13193  13194 -13195 -126 -13198 0

c  0+1 --> 1
c    (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧  p_126) -> (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0)
c  in CNF:
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_2
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_1
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨  b^{18, 8}_0
c  in DIMACS:
 13193  13194  13195 -126 -13196 0
 13193  13194  13195 -126 -13197 0
 13193  13194  13195 -126  13198 0

c  1+1 --> 2
c    (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0 ∧  p_126) -> (-b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0)
c  in CNF:
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_2
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨  b^{18, 8}_1
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ -p_126 ∨ -b^{18, 8}_0
c  in DIMACS:
 13193  13194 -13195 -126 -13196 0
 13193  13194 -13195 -126  13197 0
 13193  13194 -13195 -126 -13198 0

c  2+1 --> break 
c    (-b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧  p_126) -> break
c  in CNF:
c     b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 13193 -13194  13195 -126 1162 0


c  2-1 --> 1
c    (-b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧ -p_126) -> (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0)
c  in CNF:
c     b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_2
c     b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_1
c     b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨  b^{18, 8}_0
c  in DIMACS:
 13193 -13194  13195  126 -13196 0
 13193 -13194  13195  126 -13197 0
 13193 -13194  13195  126  13198 0

c  1-1 --> 0
c    (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0 ∧ -p_126) -> (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧ -b^{18, 8}_0)
c  in CNF:
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_2
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_1
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_0
c  in DIMACS:
 13193  13194 -13195  126 -13196 0
 13193  13194 -13195  126 -13197 0
 13193  13194 -13195  126 -13198 0

c  0-1 --> -1
c    (-b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧ -p_126) -> ( b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0)
c  in CNF:
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨  b^{18, 8}_2
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_1
c     b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨  b^{18, 8}_0
c  in DIMACS:
 13193  13194  13195  126  13196 0
 13193  13194  13195  126 -13197 0
 13193  13194  13195  126  13198 0

c  -1-1 --> -2
c    ( b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧  b^{18, 7}_0 ∧ -p_126) -> ( b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0)
c  in CNF:
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨  b^{18, 8}_2
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨  b^{18, 8}_1
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨  p_126 ∨ -b^{18, 8}_0
c  in DIMACS:
-13193  13194 -13195  126  13196 0
-13193  13194 -13195  126  13197 0
-13193  13194 -13195  126 -13198 0

c  -2-1 --> break 
c    ( b^{18, 7}_2 ∧  b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨  b^{18, 7}_0 ∨  p_126 ∨ break
c  in DIMACS:
-13193 -13194  13195  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 7}_2 ∧ -b^{18, 7}_1 ∧ -b^{18, 7}_0 ∧ true) 
c  in CNF:
c    -b^{18, 7}_2 ∨  b^{18, 7}_1 ∨  b^{18, 7}_0 ∨ false 
c  in DIMACS:
-13193  13194  13195  0

c  3 does not represent an automaton state.
c    -(-b^{18, 7}_2 ∧  b^{18, 7}_1 ∧  b^{18, 7}_0 ∧ true) 
c  in CNF:
c     b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ false 
c  in DIMACS:
 13193 -13194 -13195  0
c  -3 does not represent an automaton state.
c    -( b^{18, 7}_2 ∧  b^{18, 7}_1 ∧  b^{18, 7}_0 ∧ true) 
c  in CNF:
c    -b^{18, 7}_2 ∨ -b^{18, 7}_1 ∨ -b^{18, 7}_0 ∨ false 
c  in DIMACS:
-13193 -13194 -13195  0

c i = 8
c  -2+1 --> -1
c    ( b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧  p_144) -> ( b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0)
c  in CNF:
c    -b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨  b^{18, 9}_2
c    -b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_1
c    -b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨  b^{18, 9}_0
c  in DIMACS:
-13196 -13197  13198 -144  13199 0
-13196 -13197  13198 -144 -13200 0
-13196 -13197  13198 -144  13201 0

c  -1+1 --> 0
c    ( b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0 ∧  p_144) -> (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧ -b^{18, 9}_0)
c  in CNF:
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_2
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_1
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_0
c  in DIMACS:
-13196  13197 -13198 -144 -13199 0
-13196  13197 -13198 -144 -13200 0
-13196  13197 -13198 -144 -13201 0

c  0+1 --> 1
c    (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧  p_144) -> (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0)
c  in CNF:
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_2
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_1
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨  b^{18, 9}_0
c  in DIMACS:
 13196  13197  13198 -144 -13199 0
 13196  13197  13198 -144 -13200 0
 13196  13197  13198 -144  13201 0

c  1+1 --> 2
c    (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0 ∧  p_144) -> (-b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0)
c  in CNF:
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_2
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨  b^{18, 9}_1
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ -p_144 ∨ -b^{18, 9}_0
c  in DIMACS:
 13196  13197 -13198 -144 -13199 0
 13196  13197 -13198 -144  13200 0
 13196  13197 -13198 -144 -13201 0

c  2+1 --> break 
c    (-b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧  p_144) -> break
c  in CNF:
c     b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 13196 -13197  13198 -144 1162 0


c  2-1 --> 1
c    (-b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧ -p_144) -> (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0)
c  in CNF:
c     b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_2
c     b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_1
c     b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨  b^{18, 9}_0
c  in DIMACS:
 13196 -13197  13198  144 -13199 0
 13196 -13197  13198  144 -13200 0
 13196 -13197  13198  144  13201 0

c  1-1 --> 0
c    (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0 ∧ -p_144) -> (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧ -b^{18, 9}_0)
c  in CNF:
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_2
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_1
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_0
c  in DIMACS:
 13196  13197 -13198  144 -13199 0
 13196  13197 -13198  144 -13200 0
 13196  13197 -13198  144 -13201 0

c  0-1 --> -1
c    (-b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧ -p_144) -> ( b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0)
c  in CNF:
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨  b^{18, 9}_2
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_1
c     b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨  b^{18, 9}_0
c  in DIMACS:
 13196  13197  13198  144  13199 0
 13196  13197  13198  144 -13200 0
 13196  13197  13198  144  13201 0

c  -1-1 --> -2
c    ( b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧  b^{18, 8}_0 ∧ -p_144) -> ( b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0)
c  in CNF:
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨  b^{18, 9}_2
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨  b^{18, 9}_1
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨  p_144 ∨ -b^{18, 9}_0
c  in DIMACS:
-13196  13197 -13198  144  13199 0
-13196  13197 -13198  144  13200 0
-13196  13197 -13198  144 -13201 0

c  -2-1 --> break 
c    ( b^{18, 8}_2 ∧  b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨  b^{18, 8}_0 ∨  p_144 ∨ break
c  in DIMACS:
-13196 -13197  13198  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 8}_2 ∧ -b^{18, 8}_1 ∧ -b^{18, 8}_0 ∧ true) 
c  in CNF:
c    -b^{18, 8}_2 ∨  b^{18, 8}_1 ∨  b^{18, 8}_0 ∨ false 
c  in DIMACS:
-13196  13197  13198  0

c  3 does not represent an automaton state.
c    -(-b^{18, 8}_2 ∧  b^{18, 8}_1 ∧  b^{18, 8}_0 ∧ true) 
c  in CNF:
c     b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ false 
c  in DIMACS:
 13196 -13197 -13198  0
c  -3 does not represent an automaton state.
c    -( b^{18, 8}_2 ∧  b^{18, 8}_1 ∧  b^{18, 8}_0 ∧ true) 
c  in CNF:
c    -b^{18, 8}_2 ∨ -b^{18, 8}_1 ∨ -b^{18, 8}_0 ∨ false 
c  in DIMACS:
-13196 -13197 -13198  0

c i = 9
c  -2+1 --> -1
c    ( b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧  p_162) -> ( b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0)
c  in CNF:
c    -b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨  b^{18, 10}_2
c    -b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_1
c    -b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨  b^{18, 10}_0
c  in DIMACS:
-13199 -13200  13201 -162  13202 0
-13199 -13200  13201 -162 -13203 0
-13199 -13200  13201 -162  13204 0

c  -1+1 --> 0
c    ( b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0 ∧  p_162) -> (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧ -b^{18, 10}_0)
c  in CNF:
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_2
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_1
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_0
c  in DIMACS:
-13199  13200 -13201 -162 -13202 0
-13199  13200 -13201 -162 -13203 0
-13199  13200 -13201 -162 -13204 0

c  0+1 --> 1
c    (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧  p_162) -> (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0)
c  in CNF:
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_2
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_1
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨  b^{18, 10}_0
c  in DIMACS:
 13199  13200  13201 -162 -13202 0
 13199  13200  13201 -162 -13203 0
 13199  13200  13201 -162  13204 0

c  1+1 --> 2
c    (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0 ∧  p_162) -> (-b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0)
c  in CNF:
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_2
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨  b^{18, 10}_1
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ -p_162 ∨ -b^{18, 10}_0
c  in DIMACS:
 13199  13200 -13201 -162 -13202 0
 13199  13200 -13201 -162  13203 0
 13199  13200 -13201 -162 -13204 0

c  2+1 --> break 
c    (-b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧  p_162) -> break
c  in CNF:
c     b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 13199 -13200  13201 -162 1162 0


c  2-1 --> 1
c    (-b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧ -p_162) -> (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0)
c  in CNF:
c     b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_2
c     b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_1
c     b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨  b^{18, 10}_0
c  in DIMACS:
 13199 -13200  13201  162 -13202 0
 13199 -13200  13201  162 -13203 0
 13199 -13200  13201  162  13204 0

c  1-1 --> 0
c    (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0 ∧ -p_162) -> (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧ -b^{18, 10}_0)
c  in CNF:
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_2
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_1
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_0
c  in DIMACS:
 13199  13200 -13201  162 -13202 0
 13199  13200 -13201  162 -13203 0
 13199  13200 -13201  162 -13204 0

c  0-1 --> -1
c    (-b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧ -p_162) -> ( b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0)
c  in CNF:
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨  b^{18, 10}_2
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_1
c     b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨  b^{18, 10}_0
c  in DIMACS:
 13199  13200  13201  162  13202 0
 13199  13200  13201  162 -13203 0
 13199  13200  13201  162  13204 0

c  -1-1 --> -2
c    ( b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧  b^{18, 9}_0 ∧ -p_162) -> ( b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0)
c  in CNF:
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨  b^{18, 10}_2
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨  b^{18, 10}_1
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨  p_162 ∨ -b^{18, 10}_0
c  in DIMACS:
-13199  13200 -13201  162  13202 0
-13199  13200 -13201  162  13203 0
-13199  13200 -13201  162 -13204 0

c  -2-1 --> break 
c    ( b^{18, 9}_2 ∧  b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨  b^{18, 9}_0 ∨  p_162 ∨ break
c  in DIMACS:
-13199 -13200  13201  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 9}_2 ∧ -b^{18, 9}_1 ∧ -b^{18, 9}_0 ∧ true) 
c  in CNF:
c    -b^{18, 9}_2 ∨  b^{18, 9}_1 ∨  b^{18, 9}_0 ∨ false 
c  in DIMACS:
-13199  13200  13201  0

c  3 does not represent an automaton state.
c    -(-b^{18, 9}_2 ∧  b^{18, 9}_1 ∧  b^{18, 9}_0 ∧ true) 
c  in CNF:
c     b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ false 
c  in DIMACS:
 13199 -13200 -13201  0
c  -3 does not represent an automaton state.
c    -( b^{18, 9}_2 ∧  b^{18, 9}_1 ∧  b^{18, 9}_0 ∧ true) 
c  in CNF:
c    -b^{18, 9}_2 ∨ -b^{18, 9}_1 ∨ -b^{18, 9}_0 ∨ false 
c  in DIMACS:
-13199 -13200 -13201  0

c i = 10
c  -2+1 --> -1
c    ( b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧  p_180) -> ( b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0)
c  in CNF:
c    -b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨  b^{18, 11}_2
c    -b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_1
c    -b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨  b^{18, 11}_0
c  in DIMACS:
-13202 -13203  13204 -180  13205 0
-13202 -13203  13204 -180 -13206 0
-13202 -13203  13204 -180  13207 0

c  -1+1 --> 0
c    ( b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0 ∧  p_180) -> (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧ -b^{18, 11}_0)
c  in CNF:
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_2
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_1
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_0
c  in DIMACS:
-13202  13203 -13204 -180 -13205 0
-13202  13203 -13204 -180 -13206 0
-13202  13203 -13204 -180 -13207 0

c  0+1 --> 1
c    (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧  p_180) -> (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0)
c  in CNF:
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_2
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_1
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨  b^{18, 11}_0
c  in DIMACS:
 13202  13203  13204 -180 -13205 0
 13202  13203  13204 -180 -13206 0
 13202  13203  13204 -180  13207 0

c  1+1 --> 2
c    (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0 ∧  p_180) -> (-b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0)
c  in CNF:
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_2
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨  b^{18, 11}_1
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ -p_180 ∨ -b^{18, 11}_0
c  in DIMACS:
 13202  13203 -13204 -180 -13205 0
 13202  13203 -13204 -180  13206 0
 13202  13203 -13204 -180 -13207 0

c  2+1 --> break 
c    (-b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧  p_180) -> break
c  in CNF:
c     b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 13202 -13203  13204 -180 1162 0


c  2-1 --> 1
c    (-b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧ -p_180) -> (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0)
c  in CNF:
c     b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_2
c     b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_1
c     b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨  b^{18, 11}_0
c  in DIMACS:
 13202 -13203  13204  180 -13205 0
 13202 -13203  13204  180 -13206 0
 13202 -13203  13204  180  13207 0

c  1-1 --> 0
c    (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0 ∧ -p_180) -> (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧ -b^{18, 11}_0)
c  in CNF:
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_2
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_1
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_0
c  in DIMACS:
 13202  13203 -13204  180 -13205 0
 13202  13203 -13204  180 -13206 0
 13202  13203 -13204  180 -13207 0

c  0-1 --> -1
c    (-b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧ -p_180) -> ( b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0)
c  in CNF:
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨  b^{18, 11}_2
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_1
c     b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨  b^{18, 11}_0
c  in DIMACS:
 13202  13203  13204  180  13205 0
 13202  13203  13204  180 -13206 0
 13202  13203  13204  180  13207 0

c  -1-1 --> -2
c    ( b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧  b^{18, 10}_0 ∧ -p_180) -> ( b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0)
c  in CNF:
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨  b^{18, 11}_2
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨  b^{18, 11}_1
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨  p_180 ∨ -b^{18, 11}_0
c  in DIMACS:
-13202  13203 -13204  180  13205 0
-13202  13203 -13204  180  13206 0
-13202  13203 -13204  180 -13207 0

c  -2-1 --> break 
c    ( b^{18, 10}_2 ∧  b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨  b^{18, 10}_0 ∨  p_180 ∨ break
c  in DIMACS:
-13202 -13203  13204  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 10}_2 ∧ -b^{18, 10}_1 ∧ -b^{18, 10}_0 ∧ true) 
c  in CNF:
c    -b^{18, 10}_2 ∨  b^{18, 10}_1 ∨  b^{18, 10}_0 ∨ false 
c  in DIMACS:
-13202  13203  13204  0

c  3 does not represent an automaton state.
c    -(-b^{18, 10}_2 ∧  b^{18, 10}_1 ∧  b^{18, 10}_0 ∧ true) 
c  in CNF:
c     b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ false 
c  in DIMACS:
 13202 -13203 -13204  0
c  -3 does not represent an automaton state.
c    -( b^{18, 10}_2 ∧  b^{18, 10}_1 ∧  b^{18, 10}_0 ∧ true) 
c  in CNF:
c    -b^{18, 10}_2 ∨ -b^{18, 10}_1 ∨ -b^{18, 10}_0 ∨ false 
c  in DIMACS:
-13202 -13203 -13204  0

c i = 11
c  -2+1 --> -1
c    ( b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧  p_198) -> ( b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0)
c  in CNF:
c    -b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨  b^{18, 12}_2
c    -b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_1
c    -b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨  b^{18, 12}_0
c  in DIMACS:
-13205 -13206  13207 -198  13208 0
-13205 -13206  13207 -198 -13209 0
-13205 -13206  13207 -198  13210 0

c  -1+1 --> 0
c    ( b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0 ∧  p_198) -> (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧ -b^{18, 12}_0)
c  in CNF:
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_2
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_1
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_0
c  in DIMACS:
-13205  13206 -13207 -198 -13208 0
-13205  13206 -13207 -198 -13209 0
-13205  13206 -13207 -198 -13210 0

c  0+1 --> 1
c    (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧  p_198) -> (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0)
c  in CNF:
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_2
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_1
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨  b^{18, 12}_0
c  in DIMACS:
 13205  13206  13207 -198 -13208 0
 13205  13206  13207 -198 -13209 0
 13205  13206  13207 -198  13210 0

c  1+1 --> 2
c    (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0 ∧  p_198) -> (-b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0)
c  in CNF:
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_2
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨  b^{18, 12}_1
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ -p_198 ∨ -b^{18, 12}_0
c  in DIMACS:
 13205  13206 -13207 -198 -13208 0
 13205  13206 -13207 -198  13209 0
 13205  13206 -13207 -198 -13210 0

c  2+1 --> break 
c    (-b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧  p_198) -> break
c  in CNF:
c     b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 13205 -13206  13207 -198 1162 0


c  2-1 --> 1
c    (-b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧ -p_198) -> (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0)
c  in CNF:
c     b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_2
c     b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_1
c     b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨  b^{18, 12}_0
c  in DIMACS:
 13205 -13206  13207  198 -13208 0
 13205 -13206  13207  198 -13209 0
 13205 -13206  13207  198  13210 0

c  1-1 --> 0
c    (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0 ∧ -p_198) -> (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧ -b^{18, 12}_0)
c  in CNF:
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_2
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_1
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_0
c  in DIMACS:
 13205  13206 -13207  198 -13208 0
 13205  13206 -13207  198 -13209 0
 13205  13206 -13207  198 -13210 0

c  0-1 --> -1
c    (-b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧ -p_198) -> ( b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0)
c  in CNF:
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨  b^{18, 12}_2
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_1
c     b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨  b^{18, 12}_0
c  in DIMACS:
 13205  13206  13207  198  13208 0
 13205  13206  13207  198 -13209 0
 13205  13206  13207  198  13210 0

c  -1-1 --> -2
c    ( b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧  b^{18, 11}_0 ∧ -p_198) -> ( b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0)
c  in CNF:
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨  b^{18, 12}_2
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨  b^{18, 12}_1
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨  p_198 ∨ -b^{18, 12}_0
c  in DIMACS:
-13205  13206 -13207  198  13208 0
-13205  13206 -13207  198  13209 0
-13205  13206 -13207  198 -13210 0

c  -2-1 --> break 
c    ( b^{18, 11}_2 ∧  b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨  b^{18, 11}_0 ∨  p_198 ∨ break
c  in DIMACS:
-13205 -13206  13207  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 11}_2 ∧ -b^{18, 11}_1 ∧ -b^{18, 11}_0 ∧ true) 
c  in CNF:
c    -b^{18, 11}_2 ∨  b^{18, 11}_1 ∨  b^{18, 11}_0 ∨ false 
c  in DIMACS:
-13205  13206  13207  0

c  3 does not represent an automaton state.
c    -(-b^{18, 11}_2 ∧  b^{18, 11}_1 ∧  b^{18, 11}_0 ∧ true) 
c  in CNF:
c     b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ false 
c  in DIMACS:
 13205 -13206 -13207  0
c  -3 does not represent an automaton state.
c    -( b^{18, 11}_2 ∧  b^{18, 11}_1 ∧  b^{18, 11}_0 ∧ true) 
c  in CNF:
c    -b^{18, 11}_2 ∨ -b^{18, 11}_1 ∨ -b^{18, 11}_0 ∨ false 
c  in DIMACS:
-13205 -13206 -13207  0

c i = 12
c  -2+1 --> -1
c    ( b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧  p_216) -> ( b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0)
c  in CNF:
c    -b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨  b^{18, 13}_2
c    -b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_1
c    -b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨  b^{18, 13}_0
c  in DIMACS:
-13208 -13209  13210 -216  13211 0
-13208 -13209  13210 -216 -13212 0
-13208 -13209  13210 -216  13213 0

c  -1+1 --> 0
c    ( b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0 ∧  p_216) -> (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧ -b^{18, 13}_0)
c  in CNF:
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_2
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_1
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_0
c  in DIMACS:
-13208  13209 -13210 -216 -13211 0
-13208  13209 -13210 -216 -13212 0
-13208  13209 -13210 -216 -13213 0

c  0+1 --> 1
c    (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧  p_216) -> (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0)
c  in CNF:
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_2
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_1
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨  b^{18, 13}_0
c  in DIMACS:
 13208  13209  13210 -216 -13211 0
 13208  13209  13210 -216 -13212 0
 13208  13209  13210 -216  13213 0

c  1+1 --> 2
c    (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0 ∧  p_216) -> (-b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0)
c  in CNF:
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_2
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨  b^{18, 13}_1
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ -p_216 ∨ -b^{18, 13}_0
c  in DIMACS:
 13208  13209 -13210 -216 -13211 0
 13208  13209 -13210 -216  13212 0
 13208  13209 -13210 -216 -13213 0

c  2+1 --> break 
c    (-b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧  p_216) -> break
c  in CNF:
c     b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 13208 -13209  13210 -216 1162 0


c  2-1 --> 1
c    (-b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧ -p_216) -> (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0)
c  in CNF:
c     b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_2
c     b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_1
c     b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨  b^{18, 13}_0
c  in DIMACS:
 13208 -13209  13210  216 -13211 0
 13208 -13209  13210  216 -13212 0
 13208 -13209  13210  216  13213 0

c  1-1 --> 0
c    (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0 ∧ -p_216) -> (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧ -b^{18, 13}_0)
c  in CNF:
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_2
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_1
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_0
c  in DIMACS:
 13208  13209 -13210  216 -13211 0
 13208  13209 -13210  216 -13212 0
 13208  13209 -13210  216 -13213 0

c  0-1 --> -1
c    (-b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧ -p_216) -> ( b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0)
c  in CNF:
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨  b^{18, 13}_2
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_1
c     b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨  b^{18, 13}_0
c  in DIMACS:
 13208  13209  13210  216  13211 0
 13208  13209  13210  216 -13212 0
 13208  13209  13210  216  13213 0

c  -1-1 --> -2
c    ( b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧  b^{18, 12}_0 ∧ -p_216) -> ( b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0)
c  in CNF:
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨  b^{18, 13}_2
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨  b^{18, 13}_1
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨  p_216 ∨ -b^{18, 13}_0
c  in DIMACS:
-13208  13209 -13210  216  13211 0
-13208  13209 -13210  216  13212 0
-13208  13209 -13210  216 -13213 0

c  -2-1 --> break 
c    ( b^{18, 12}_2 ∧  b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨  b^{18, 12}_0 ∨  p_216 ∨ break
c  in DIMACS:
-13208 -13209  13210  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 12}_2 ∧ -b^{18, 12}_1 ∧ -b^{18, 12}_0 ∧ true) 
c  in CNF:
c    -b^{18, 12}_2 ∨  b^{18, 12}_1 ∨  b^{18, 12}_0 ∨ false 
c  in DIMACS:
-13208  13209  13210  0

c  3 does not represent an automaton state.
c    -(-b^{18, 12}_2 ∧  b^{18, 12}_1 ∧  b^{18, 12}_0 ∧ true) 
c  in CNF:
c     b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ false 
c  in DIMACS:
 13208 -13209 -13210  0
c  -3 does not represent an automaton state.
c    -( b^{18, 12}_2 ∧  b^{18, 12}_1 ∧  b^{18, 12}_0 ∧ true) 
c  in CNF:
c    -b^{18, 12}_2 ∨ -b^{18, 12}_1 ∨ -b^{18, 12}_0 ∨ false 
c  in DIMACS:
-13208 -13209 -13210  0

c i = 13
c  -2+1 --> -1
c    ( b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧  p_234) -> ( b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0)
c  in CNF:
c    -b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨  b^{18, 14}_2
c    -b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_1
c    -b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨  b^{18, 14}_0
c  in DIMACS:
-13211 -13212  13213 -234  13214 0
-13211 -13212  13213 -234 -13215 0
-13211 -13212  13213 -234  13216 0

c  -1+1 --> 0
c    ( b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0 ∧  p_234) -> (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧ -b^{18, 14}_0)
c  in CNF:
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_2
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_1
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_0
c  in DIMACS:
-13211  13212 -13213 -234 -13214 0
-13211  13212 -13213 -234 -13215 0
-13211  13212 -13213 -234 -13216 0

c  0+1 --> 1
c    (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧  p_234) -> (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0)
c  in CNF:
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_2
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_1
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨  b^{18, 14}_0
c  in DIMACS:
 13211  13212  13213 -234 -13214 0
 13211  13212  13213 -234 -13215 0
 13211  13212  13213 -234  13216 0

c  1+1 --> 2
c    (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0 ∧  p_234) -> (-b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0)
c  in CNF:
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_2
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨  b^{18, 14}_1
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ -p_234 ∨ -b^{18, 14}_0
c  in DIMACS:
 13211  13212 -13213 -234 -13214 0
 13211  13212 -13213 -234  13215 0
 13211  13212 -13213 -234 -13216 0

c  2+1 --> break 
c    (-b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧  p_234) -> break
c  in CNF:
c     b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 13211 -13212  13213 -234 1162 0


c  2-1 --> 1
c    (-b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧ -p_234) -> (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0)
c  in CNF:
c     b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_2
c     b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_1
c     b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨  b^{18, 14}_0
c  in DIMACS:
 13211 -13212  13213  234 -13214 0
 13211 -13212  13213  234 -13215 0
 13211 -13212  13213  234  13216 0

c  1-1 --> 0
c    (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0 ∧ -p_234) -> (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧ -b^{18, 14}_0)
c  in CNF:
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_2
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_1
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_0
c  in DIMACS:
 13211  13212 -13213  234 -13214 0
 13211  13212 -13213  234 -13215 0
 13211  13212 -13213  234 -13216 0

c  0-1 --> -1
c    (-b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧ -p_234) -> ( b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0)
c  in CNF:
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨  b^{18, 14}_2
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_1
c     b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨  b^{18, 14}_0
c  in DIMACS:
 13211  13212  13213  234  13214 0
 13211  13212  13213  234 -13215 0
 13211  13212  13213  234  13216 0

c  -1-1 --> -2
c    ( b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧  b^{18, 13}_0 ∧ -p_234) -> ( b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0)
c  in CNF:
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨  b^{18, 14}_2
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨  b^{18, 14}_1
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨  p_234 ∨ -b^{18, 14}_0
c  in DIMACS:
-13211  13212 -13213  234  13214 0
-13211  13212 -13213  234  13215 0
-13211  13212 -13213  234 -13216 0

c  -2-1 --> break 
c    ( b^{18, 13}_2 ∧  b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨  b^{18, 13}_0 ∨  p_234 ∨ break
c  in DIMACS:
-13211 -13212  13213  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 13}_2 ∧ -b^{18, 13}_1 ∧ -b^{18, 13}_0 ∧ true) 
c  in CNF:
c    -b^{18, 13}_2 ∨  b^{18, 13}_1 ∨  b^{18, 13}_0 ∨ false 
c  in DIMACS:
-13211  13212  13213  0

c  3 does not represent an automaton state.
c    -(-b^{18, 13}_2 ∧  b^{18, 13}_1 ∧  b^{18, 13}_0 ∧ true) 
c  in CNF:
c     b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ false 
c  in DIMACS:
 13211 -13212 -13213  0
c  -3 does not represent an automaton state.
c    -( b^{18, 13}_2 ∧  b^{18, 13}_1 ∧  b^{18, 13}_0 ∧ true) 
c  in CNF:
c    -b^{18, 13}_2 ∨ -b^{18, 13}_1 ∨ -b^{18, 13}_0 ∨ false 
c  in DIMACS:
-13211 -13212 -13213  0

c i = 14
c  -2+1 --> -1
c    ( b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧  p_252) -> ( b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0)
c  in CNF:
c    -b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨  b^{18, 15}_2
c    -b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_1
c    -b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨  b^{18, 15}_0
c  in DIMACS:
-13214 -13215  13216 -252  13217 0
-13214 -13215  13216 -252 -13218 0
-13214 -13215  13216 -252  13219 0

c  -1+1 --> 0
c    ( b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0 ∧  p_252) -> (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧ -b^{18, 15}_0)
c  in CNF:
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_2
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_1
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_0
c  in DIMACS:
-13214  13215 -13216 -252 -13217 0
-13214  13215 -13216 -252 -13218 0
-13214  13215 -13216 -252 -13219 0

c  0+1 --> 1
c    (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧  p_252) -> (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0)
c  in CNF:
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_2
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_1
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨  b^{18, 15}_0
c  in DIMACS:
 13214  13215  13216 -252 -13217 0
 13214  13215  13216 -252 -13218 0
 13214  13215  13216 -252  13219 0

c  1+1 --> 2
c    (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0 ∧  p_252) -> (-b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0)
c  in CNF:
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_2
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨  b^{18, 15}_1
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ -p_252 ∨ -b^{18, 15}_0
c  in DIMACS:
 13214  13215 -13216 -252 -13217 0
 13214  13215 -13216 -252  13218 0
 13214  13215 -13216 -252 -13219 0

c  2+1 --> break 
c    (-b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧  p_252) -> break
c  in CNF:
c     b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 13214 -13215  13216 -252 1162 0


c  2-1 --> 1
c    (-b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧ -p_252) -> (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0)
c  in CNF:
c     b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_2
c     b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_1
c     b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨  b^{18, 15}_0
c  in DIMACS:
 13214 -13215  13216  252 -13217 0
 13214 -13215  13216  252 -13218 0
 13214 -13215  13216  252  13219 0

c  1-1 --> 0
c    (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0 ∧ -p_252) -> (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧ -b^{18, 15}_0)
c  in CNF:
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_2
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_1
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_0
c  in DIMACS:
 13214  13215 -13216  252 -13217 0
 13214  13215 -13216  252 -13218 0
 13214  13215 -13216  252 -13219 0

c  0-1 --> -1
c    (-b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧ -p_252) -> ( b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0)
c  in CNF:
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨  b^{18, 15}_2
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_1
c     b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨  b^{18, 15}_0
c  in DIMACS:
 13214  13215  13216  252  13217 0
 13214  13215  13216  252 -13218 0
 13214  13215  13216  252  13219 0

c  -1-1 --> -2
c    ( b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧  b^{18, 14}_0 ∧ -p_252) -> ( b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0)
c  in CNF:
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨  b^{18, 15}_2
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨  b^{18, 15}_1
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨  p_252 ∨ -b^{18, 15}_0
c  in DIMACS:
-13214  13215 -13216  252  13217 0
-13214  13215 -13216  252  13218 0
-13214  13215 -13216  252 -13219 0

c  -2-1 --> break 
c    ( b^{18, 14}_2 ∧  b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨  b^{18, 14}_0 ∨  p_252 ∨ break
c  in DIMACS:
-13214 -13215  13216  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 14}_2 ∧ -b^{18, 14}_1 ∧ -b^{18, 14}_0 ∧ true) 
c  in CNF:
c    -b^{18, 14}_2 ∨  b^{18, 14}_1 ∨  b^{18, 14}_0 ∨ false 
c  in DIMACS:
-13214  13215  13216  0

c  3 does not represent an automaton state.
c    -(-b^{18, 14}_2 ∧  b^{18, 14}_1 ∧  b^{18, 14}_0 ∧ true) 
c  in CNF:
c     b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ false 
c  in DIMACS:
 13214 -13215 -13216  0
c  -3 does not represent an automaton state.
c    -( b^{18, 14}_2 ∧  b^{18, 14}_1 ∧  b^{18, 14}_0 ∧ true) 
c  in CNF:
c    -b^{18, 14}_2 ∨ -b^{18, 14}_1 ∨ -b^{18, 14}_0 ∨ false 
c  in DIMACS:
-13214 -13215 -13216  0

c i = 15
c  -2+1 --> -1
c    ( b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧  p_270) -> ( b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0)
c  in CNF:
c    -b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨  b^{18, 16}_2
c    -b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_1
c    -b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨  b^{18, 16}_0
c  in DIMACS:
-13217 -13218  13219 -270  13220 0
-13217 -13218  13219 -270 -13221 0
-13217 -13218  13219 -270  13222 0

c  -1+1 --> 0
c    ( b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0 ∧  p_270) -> (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧ -b^{18, 16}_0)
c  in CNF:
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_2
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_1
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_0
c  in DIMACS:
-13217  13218 -13219 -270 -13220 0
-13217  13218 -13219 -270 -13221 0
-13217  13218 -13219 -270 -13222 0

c  0+1 --> 1
c    (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧  p_270) -> (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0)
c  in CNF:
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_2
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_1
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨  b^{18, 16}_0
c  in DIMACS:
 13217  13218  13219 -270 -13220 0
 13217  13218  13219 -270 -13221 0
 13217  13218  13219 -270  13222 0

c  1+1 --> 2
c    (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0 ∧  p_270) -> (-b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0)
c  in CNF:
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_2
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨  b^{18, 16}_1
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ -p_270 ∨ -b^{18, 16}_0
c  in DIMACS:
 13217  13218 -13219 -270 -13220 0
 13217  13218 -13219 -270  13221 0
 13217  13218 -13219 -270 -13222 0

c  2+1 --> break 
c    (-b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧  p_270) -> break
c  in CNF:
c     b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 13217 -13218  13219 -270 1162 0


c  2-1 --> 1
c    (-b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧ -p_270) -> (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0)
c  in CNF:
c     b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_2
c     b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_1
c     b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨  b^{18, 16}_0
c  in DIMACS:
 13217 -13218  13219  270 -13220 0
 13217 -13218  13219  270 -13221 0
 13217 -13218  13219  270  13222 0

c  1-1 --> 0
c    (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0 ∧ -p_270) -> (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧ -b^{18, 16}_0)
c  in CNF:
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_2
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_1
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_0
c  in DIMACS:
 13217  13218 -13219  270 -13220 0
 13217  13218 -13219  270 -13221 0
 13217  13218 -13219  270 -13222 0

c  0-1 --> -1
c    (-b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧ -p_270) -> ( b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0)
c  in CNF:
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨  b^{18, 16}_2
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_1
c     b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨  b^{18, 16}_0
c  in DIMACS:
 13217  13218  13219  270  13220 0
 13217  13218  13219  270 -13221 0
 13217  13218  13219  270  13222 0

c  -1-1 --> -2
c    ( b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧  b^{18, 15}_0 ∧ -p_270) -> ( b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0)
c  in CNF:
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨  b^{18, 16}_2
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨  b^{18, 16}_1
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨  p_270 ∨ -b^{18, 16}_0
c  in DIMACS:
-13217  13218 -13219  270  13220 0
-13217  13218 -13219  270  13221 0
-13217  13218 -13219  270 -13222 0

c  -2-1 --> break 
c    ( b^{18, 15}_2 ∧  b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨  b^{18, 15}_0 ∨  p_270 ∨ break
c  in DIMACS:
-13217 -13218  13219  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 15}_2 ∧ -b^{18, 15}_1 ∧ -b^{18, 15}_0 ∧ true) 
c  in CNF:
c    -b^{18, 15}_2 ∨  b^{18, 15}_1 ∨  b^{18, 15}_0 ∨ false 
c  in DIMACS:
-13217  13218  13219  0

c  3 does not represent an automaton state.
c    -(-b^{18, 15}_2 ∧  b^{18, 15}_1 ∧  b^{18, 15}_0 ∧ true) 
c  in CNF:
c     b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ false 
c  in DIMACS:
 13217 -13218 -13219  0
c  -3 does not represent an automaton state.
c    -( b^{18, 15}_2 ∧  b^{18, 15}_1 ∧  b^{18, 15}_0 ∧ true) 
c  in CNF:
c    -b^{18, 15}_2 ∨ -b^{18, 15}_1 ∨ -b^{18, 15}_0 ∨ false 
c  in DIMACS:
-13217 -13218 -13219  0

c i = 16
c  -2+1 --> -1
c    ( b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧  p_288) -> ( b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0)
c  in CNF:
c    -b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨  b^{18, 17}_2
c    -b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_1
c    -b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨  b^{18, 17}_0
c  in DIMACS:
-13220 -13221  13222 -288  13223 0
-13220 -13221  13222 -288 -13224 0
-13220 -13221  13222 -288  13225 0

c  -1+1 --> 0
c    ( b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0 ∧  p_288) -> (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧ -b^{18, 17}_0)
c  in CNF:
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_2
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_1
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_0
c  in DIMACS:
-13220  13221 -13222 -288 -13223 0
-13220  13221 -13222 -288 -13224 0
-13220  13221 -13222 -288 -13225 0

c  0+1 --> 1
c    (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧  p_288) -> (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0)
c  in CNF:
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_2
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_1
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨  b^{18, 17}_0
c  in DIMACS:
 13220  13221  13222 -288 -13223 0
 13220  13221  13222 -288 -13224 0
 13220  13221  13222 -288  13225 0

c  1+1 --> 2
c    (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0 ∧  p_288) -> (-b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0)
c  in CNF:
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_2
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨  b^{18, 17}_1
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ -p_288 ∨ -b^{18, 17}_0
c  in DIMACS:
 13220  13221 -13222 -288 -13223 0
 13220  13221 -13222 -288  13224 0
 13220  13221 -13222 -288 -13225 0

c  2+1 --> break 
c    (-b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧  p_288) -> break
c  in CNF:
c     b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 13220 -13221  13222 -288 1162 0


c  2-1 --> 1
c    (-b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧ -p_288) -> (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0)
c  in CNF:
c     b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_2
c     b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_1
c     b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨  b^{18, 17}_0
c  in DIMACS:
 13220 -13221  13222  288 -13223 0
 13220 -13221  13222  288 -13224 0
 13220 -13221  13222  288  13225 0

c  1-1 --> 0
c    (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0 ∧ -p_288) -> (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧ -b^{18, 17}_0)
c  in CNF:
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_2
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_1
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_0
c  in DIMACS:
 13220  13221 -13222  288 -13223 0
 13220  13221 -13222  288 -13224 0
 13220  13221 -13222  288 -13225 0

c  0-1 --> -1
c    (-b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧ -p_288) -> ( b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0)
c  in CNF:
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨  b^{18, 17}_2
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_1
c     b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨  b^{18, 17}_0
c  in DIMACS:
 13220  13221  13222  288  13223 0
 13220  13221  13222  288 -13224 0
 13220  13221  13222  288  13225 0

c  -1-1 --> -2
c    ( b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧  b^{18, 16}_0 ∧ -p_288) -> ( b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0)
c  in CNF:
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨  b^{18, 17}_2
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨  b^{18, 17}_1
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨  p_288 ∨ -b^{18, 17}_0
c  in DIMACS:
-13220  13221 -13222  288  13223 0
-13220  13221 -13222  288  13224 0
-13220  13221 -13222  288 -13225 0

c  -2-1 --> break 
c    ( b^{18, 16}_2 ∧  b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨  b^{18, 16}_0 ∨  p_288 ∨ break
c  in DIMACS:
-13220 -13221  13222  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 16}_2 ∧ -b^{18, 16}_1 ∧ -b^{18, 16}_0 ∧ true) 
c  in CNF:
c    -b^{18, 16}_2 ∨  b^{18, 16}_1 ∨  b^{18, 16}_0 ∨ false 
c  in DIMACS:
-13220  13221  13222  0

c  3 does not represent an automaton state.
c    -(-b^{18, 16}_2 ∧  b^{18, 16}_1 ∧  b^{18, 16}_0 ∧ true) 
c  in CNF:
c     b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ false 
c  in DIMACS:
 13220 -13221 -13222  0
c  -3 does not represent an automaton state.
c    -( b^{18, 16}_2 ∧  b^{18, 16}_1 ∧  b^{18, 16}_0 ∧ true) 
c  in CNF:
c    -b^{18, 16}_2 ∨ -b^{18, 16}_1 ∨ -b^{18, 16}_0 ∨ false 
c  in DIMACS:
-13220 -13221 -13222  0

c i = 17
c  -2+1 --> -1
c    ( b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧  p_306) -> ( b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0)
c  in CNF:
c    -b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨  b^{18, 18}_2
c    -b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_1
c    -b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨  b^{18, 18}_0
c  in DIMACS:
-13223 -13224  13225 -306  13226 0
-13223 -13224  13225 -306 -13227 0
-13223 -13224  13225 -306  13228 0

c  -1+1 --> 0
c    ( b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0 ∧  p_306) -> (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧ -b^{18, 18}_0)
c  in CNF:
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_2
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_1
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_0
c  in DIMACS:
-13223  13224 -13225 -306 -13226 0
-13223  13224 -13225 -306 -13227 0
-13223  13224 -13225 -306 -13228 0

c  0+1 --> 1
c    (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧  p_306) -> (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0)
c  in CNF:
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_2
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_1
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨  b^{18, 18}_0
c  in DIMACS:
 13223  13224  13225 -306 -13226 0
 13223  13224  13225 -306 -13227 0
 13223  13224  13225 -306  13228 0

c  1+1 --> 2
c    (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0 ∧  p_306) -> (-b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0)
c  in CNF:
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_2
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨  b^{18, 18}_1
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ -p_306 ∨ -b^{18, 18}_0
c  in DIMACS:
 13223  13224 -13225 -306 -13226 0
 13223  13224 -13225 -306  13227 0
 13223  13224 -13225 -306 -13228 0

c  2+1 --> break 
c    (-b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧  p_306) -> break
c  in CNF:
c     b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 13223 -13224  13225 -306 1162 0


c  2-1 --> 1
c    (-b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧ -p_306) -> (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0)
c  in CNF:
c     b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_2
c     b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_1
c     b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨  b^{18, 18}_0
c  in DIMACS:
 13223 -13224  13225  306 -13226 0
 13223 -13224  13225  306 -13227 0
 13223 -13224  13225  306  13228 0

c  1-1 --> 0
c    (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0 ∧ -p_306) -> (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧ -b^{18, 18}_0)
c  in CNF:
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_2
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_1
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_0
c  in DIMACS:
 13223  13224 -13225  306 -13226 0
 13223  13224 -13225  306 -13227 0
 13223  13224 -13225  306 -13228 0

c  0-1 --> -1
c    (-b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧ -p_306) -> ( b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0)
c  in CNF:
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨  b^{18, 18}_2
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_1
c     b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨  b^{18, 18}_0
c  in DIMACS:
 13223  13224  13225  306  13226 0
 13223  13224  13225  306 -13227 0
 13223  13224  13225  306  13228 0

c  -1-1 --> -2
c    ( b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧  b^{18, 17}_0 ∧ -p_306) -> ( b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0)
c  in CNF:
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨  b^{18, 18}_2
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨  b^{18, 18}_1
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨  p_306 ∨ -b^{18, 18}_0
c  in DIMACS:
-13223  13224 -13225  306  13226 0
-13223  13224 -13225  306  13227 0
-13223  13224 -13225  306 -13228 0

c  -2-1 --> break 
c    ( b^{18, 17}_2 ∧  b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨  b^{18, 17}_0 ∨  p_306 ∨ break
c  in DIMACS:
-13223 -13224  13225  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 17}_2 ∧ -b^{18, 17}_1 ∧ -b^{18, 17}_0 ∧ true) 
c  in CNF:
c    -b^{18, 17}_2 ∨  b^{18, 17}_1 ∨  b^{18, 17}_0 ∨ false 
c  in DIMACS:
-13223  13224  13225  0

c  3 does not represent an automaton state.
c    -(-b^{18, 17}_2 ∧  b^{18, 17}_1 ∧  b^{18, 17}_0 ∧ true) 
c  in CNF:
c     b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ false 
c  in DIMACS:
 13223 -13224 -13225  0
c  -3 does not represent an automaton state.
c    -( b^{18, 17}_2 ∧  b^{18, 17}_1 ∧  b^{18, 17}_0 ∧ true) 
c  in CNF:
c    -b^{18, 17}_2 ∨ -b^{18, 17}_1 ∨ -b^{18, 17}_0 ∨ false 
c  in DIMACS:
-13223 -13224 -13225  0

c i = 18
c  -2+1 --> -1
c    ( b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧  p_324) -> ( b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0)
c  in CNF:
c    -b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨  b^{18, 19}_2
c    -b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_1
c    -b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨  b^{18, 19}_0
c  in DIMACS:
-13226 -13227  13228 -324  13229 0
-13226 -13227  13228 -324 -13230 0
-13226 -13227  13228 -324  13231 0

c  -1+1 --> 0
c    ( b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0 ∧  p_324) -> (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧ -b^{18, 19}_0)
c  in CNF:
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_2
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_1
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_0
c  in DIMACS:
-13226  13227 -13228 -324 -13229 0
-13226  13227 -13228 -324 -13230 0
-13226  13227 -13228 -324 -13231 0

c  0+1 --> 1
c    (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧  p_324) -> (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0)
c  in CNF:
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_2
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_1
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨  b^{18, 19}_0
c  in DIMACS:
 13226  13227  13228 -324 -13229 0
 13226  13227  13228 -324 -13230 0
 13226  13227  13228 -324  13231 0

c  1+1 --> 2
c    (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0 ∧  p_324) -> (-b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0)
c  in CNF:
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_2
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨  b^{18, 19}_1
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ -p_324 ∨ -b^{18, 19}_0
c  in DIMACS:
 13226  13227 -13228 -324 -13229 0
 13226  13227 -13228 -324  13230 0
 13226  13227 -13228 -324 -13231 0

c  2+1 --> break 
c    (-b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧  p_324) -> break
c  in CNF:
c     b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 13226 -13227  13228 -324 1162 0


c  2-1 --> 1
c    (-b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧ -p_324) -> (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0)
c  in CNF:
c     b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_2
c     b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_1
c     b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨  b^{18, 19}_0
c  in DIMACS:
 13226 -13227  13228  324 -13229 0
 13226 -13227  13228  324 -13230 0
 13226 -13227  13228  324  13231 0

c  1-1 --> 0
c    (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0 ∧ -p_324) -> (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧ -b^{18, 19}_0)
c  in CNF:
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_2
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_1
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_0
c  in DIMACS:
 13226  13227 -13228  324 -13229 0
 13226  13227 -13228  324 -13230 0
 13226  13227 -13228  324 -13231 0

c  0-1 --> -1
c    (-b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧ -p_324) -> ( b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0)
c  in CNF:
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨  b^{18, 19}_2
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_1
c     b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨  b^{18, 19}_0
c  in DIMACS:
 13226  13227  13228  324  13229 0
 13226  13227  13228  324 -13230 0
 13226  13227  13228  324  13231 0

c  -1-1 --> -2
c    ( b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧  b^{18, 18}_0 ∧ -p_324) -> ( b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0)
c  in CNF:
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨  b^{18, 19}_2
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨  b^{18, 19}_1
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨  p_324 ∨ -b^{18, 19}_0
c  in DIMACS:
-13226  13227 -13228  324  13229 0
-13226  13227 -13228  324  13230 0
-13226  13227 -13228  324 -13231 0

c  -2-1 --> break 
c    ( b^{18, 18}_2 ∧  b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨  b^{18, 18}_0 ∨  p_324 ∨ break
c  in DIMACS:
-13226 -13227  13228  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 18}_2 ∧ -b^{18, 18}_1 ∧ -b^{18, 18}_0 ∧ true) 
c  in CNF:
c    -b^{18, 18}_2 ∨  b^{18, 18}_1 ∨  b^{18, 18}_0 ∨ false 
c  in DIMACS:
-13226  13227  13228  0

c  3 does not represent an automaton state.
c    -(-b^{18, 18}_2 ∧  b^{18, 18}_1 ∧  b^{18, 18}_0 ∧ true) 
c  in CNF:
c     b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ false 
c  in DIMACS:
 13226 -13227 -13228  0
c  -3 does not represent an automaton state.
c    -( b^{18, 18}_2 ∧  b^{18, 18}_1 ∧  b^{18, 18}_0 ∧ true) 
c  in CNF:
c    -b^{18, 18}_2 ∨ -b^{18, 18}_1 ∨ -b^{18, 18}_0 ∨ false 
c  in DIMACS:
-13226 -13227 -13228  0

c i = 19
c  -2+1 --> -1
c    ( b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧  p_342) -> ( b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0)
c  in CNF:
c    -b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨  b^{18, 20}_2
c    -b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_1
c    -b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨  b^{18, 20}_0
c  in DIMACS:
-13229 -13230  13231 -342  13232 0
-13229 -13230  13231 -342 -13233 0
-13229 -13230  13231 -342  13234 0

c  -1+1 --> 0
c    ( b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0 ∧  p_342) -> (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧ -b^{18, 20}_0)
c  in CNF:
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_2
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_1
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_0
c  in DIMACS:
-13229  13230 -13231 -342 -13232 0
-13229  13230 -13231 -342 -13233 0
-13229  13230 -13231 -342 -13234 0

c  0+1 --> 1
c    (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧  p_342) -> (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0)
c  in CNF:
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_2
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_1
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨  b^{18, 20}_0
c  in DIMACS:
 13229  13230  13231 -342 -13232 0
 13229  13230  13231 -342 -13233 0
 13229  13230  13231 -342  13234 0

c  1+1 --> 2
c    (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0 ∧  p_342) -> (-b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0)
c  in CNF:
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_2
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨  b^{18, 20}_1
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ -p_342 ∨ -b^{18, 20}_0
c  in DIMACS:
 13229  13230 -13231 -342 -13232 0
 13229  13230 -13231 -342  13233 0
 13229  13230 -13231 -342 -13234 0

c  2+1 --> break 
c    (-b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧  p_342) -> break
c  in CNF:
c     b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 13229 -13230  13231 -342 1162 0


c  2-1 --> 1
c    (-b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧ -p_342) -> (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0)
c  in CNF:
c     b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_2
c     b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_1
c     b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨  b^{18, 20}_0
c  in DIMACS:
 13229 -13230  13231  342 -13232 0
 13229 -13230  13231  342 -13233 0
 13229 -13230  13231  342  13234 0

c  1-1 --> 0
c    (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0 ∧ -p_342) -> (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧ -b^{18, 20}_0)
c  in CNF:
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_2
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_1
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_0
c  in DIMACS:
 13229  13230 -13231  342 -13232 0
 13229  13230 -13231  342 -13233 0
 13229  13230 -13231  342 -13234 0

c  0-1 --> -1
c    (-b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧ -p_342) -> ( b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0)
c  in CNF:
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨  b^{18, 20}_2
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_1
c     b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨  b^{18, 20}_0
c  in DIMACS:
 13229  13230  13231  342  13232 0
 13229  13230  13231  342 -13233 0
 13229  13230  13231  342  13234 0

c  -1-1 --> -2
c    ( b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧  b^{18, 19}_0 ∧ -p_342) -> ( b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0)
c  in CNF:
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨  b^{18, 20}_2
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨  b^{18, 20}_1
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨  p_342 ∨ -b^{18, 20}_0
c  in DIMACS:
-13229  13230 -13231  342  13232 0
-13229  13230 -13231  342  13233 0
-13229  13230 -13231  342 -13234 0

c  -2-1 --> break 
c    ( b^{18, 19}_2 ∧  b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨  b^{18, 19}_0 ∨  p_342 ∨ break
c  in DIMACS:
-13229 -13230  13231  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 19}_2 ∧ -b^{18, 19}_1 ∧ -b^{18, 19}_0 ∧ true) 
c  in CNF:
c    -b^{18, 19}_2 ∨  b^{18, 19}_1 ∨  b^{18, 19}_0 ∨ false 
c  in DIMACS:
-13229  13230  13231  0

c  3 does not represent an automaton state.
c    -(-b^{18, 19}_2 ∧  b^{18, 19}_1 ∧  b^{18, 19}_0 ∧ true) 
c  in CNF:
c     b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ false 
c  in DIMACS:
 13229 -13230 -13231  0
c  -3 does not represent an automaton state.
c    -( b^{18, 19}_2 ∧  b^{18, 19}_1 ∧  b^{18, 19}_0 ∧ true) 
c  in CNF:
c    -b^{18, 19}_2 ∨ -b^{18, 19}_1 ∨ -b^{18, 19}_0 ∨ false 
c  in DIMACS:
-13229 -13230 -13231  0

c i = 20
c  -2+1 --> -1
c    ( b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧  p_360) -> ( b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0)
c  in CNF:
c    -b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨  b^{18, 21}_2
c    -b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_1
c    -b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨  b^{18, 21}_0
c  in DIMACS:
-13232 -13233  13234 -360  13235 0
-13232 -13233  13234 -360 -13236 0
-13232 -13233  13234 -360  13237 0

c  -1+1 --> 0
c    ( b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0 ∧  p_360) -> (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧ -b^{18, 21}_0)
c  in CNF:
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_2
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_1
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_0
c  in DIMACS:
-13232  13233 -13234 -360 -13235 0
-13232  13233 -13234 -360 -13236 0
-13232  13233 -13234 -360 -13237 0

c  0+1 --> 1
c    (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧  p_360) -> (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0)
c  in CNF:
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_2
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_1
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨  b^{18, 21}_0
c  in DIMACS:
 13232  13233  13234 -360 -13235 0
 13232  13233  13234 -360 -13236 0
 13232  13233  13234 -360  13237 0

c  1+1 --> 2
c    (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0 ∧  p_360) -> (-b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0)
c  in CNF:
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_2
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨  b^{18, 21}_1
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ -p_360 ∨ -b^{18, 21}_0
c  in DIMACS:
 13232  13233 -13234 -360 -13235 0
 13232  13233 -13234 -360  13236 0
 13232  13233 -13234 -360 -13237 0

c  2+1 --> break 
c    (-b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧  p_360) -> break
c  in CNF:
c     b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 13232 -13233  13234 -360 1162 0


c  2-1 --> 1
c    (-b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧ -p_360) -> (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0)
c  in CNF:
c     b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_2
c     b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_1
c     b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨  b^{18, 21}_0
c  in DIMACS:
 13232 -13233  13234  360 -13235 0
 13232 -13233  13234  360 -13236 0
 13232 -13233  13234  360  13237 0

c  1-1 --> 0
c    (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0 ∧ -p_360) -> (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧ -b^{18, 21}_0)
c  in CNF:
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_2
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_1
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_0
c  in DIMACS:
 13232  13233 -13234  360 -13235 0
 13232  13233 -13234  360 -13236 0
 13232  13233 -13234  360 -13237 0

c  0-1 --> -1
c    (-b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧ -p_360) -> ( b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0)
c  in CNF:
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨  b^{18, 21}_2
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_1
c     b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨  b^{18, 21}_0
c  in DIMACS:
 13232  13233  13234  360  13235 0
 13232  13233  13234  360 -13236 0
 13232  13233  13234  360  13237 0

c  -1-1 --> -2
c    ( b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧  b^{18, 20}_0 ∧ -p_360) -> ( b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0)
c  in CNF:
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨  b^{18, 21}_2
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨  b^{18, 21}_1
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨  p_360 ∨ -b^{18, 21}_0
c  in DIMACS:
-13232  13233 -13234  360  13235 0
-13232  13233 -13234  360  13236 0
-13232  13233 -13234  360 -13237 0

c  -2-1 --> break 
c    ( b^{18, 20}_2 ∧  b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨  b^{18, 20}_0 ∨  p_360 ∨ break
c  in DIMACS:
-13232 -13233  13234  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 20}_2 ∧ -b^{18, 20}_1 ∧ -b^{18, 20}_0 ∧ true) 
c  in CNF:
c    -b^{18, 20}_2 ∨  b^{18, 20}_1 ∨  b^{18, 20}_0 ∨ false 
c  in DIMACS:
-13232  13233  13234  0

c  3 does not represent an automaton state.
c    -(-b^{18, 20}_2 ∧  b^{18, 20}_1 ∧  b^{18, 20}_0 ∧ true) 
c  in CNF:
c     b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ false 
c  in DIMACS:
 13232 -13233 -13234  0
c  -3 does not represent an automaton state.
c    -( b^{18, 20}_2 ∧  b^{18, 20}_1 ∧  b^{18, 20}_0 ∧ true) 
c  in CNF:
c    -b^{18, 20}_2 ∨ -b^{18, 20}_1 ∨ -b^{18, 20}_0 ∨ false 
c  in DIMACS:
-13232 -13233 -13234  0

c i = 21
c  -2+1 --> -1
c    ( b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧  p_378) -> ( b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0)
c  in CNF:
c    -b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨  b^{18, 22}_2
c    -b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_1
c    -b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨  b^{18, 22}_0
c  in DIMACS:
-13235 -13236  13237 -378  13238 0
-13235 -13236  13237 -378 -13239 0
-13235 -13236  13237 -378  13240 0

c  -1+1 --> 0
c    ( b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0 ∧  p_378) -> (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧ -b^{18, 22}_0)
c  in CNF:
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_2
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_1
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_0
c  in DIMACS:
-13235  13236 -13237 -378 -13238 0
-13235  13236 -13237 -378 -13239 0
-13235  13236 -13237 -378 -13240 0

c  0+1 --> 1
c    (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧  p_378) -> (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0)
c  in CNF:
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_2
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_1
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨  b^{18, 22}_0
c  in DIMACS:
 13235  13236  13237 -378 -13238 0
 13235  13236  13237 -378 -13239 0
 13235  13236  13237 -378  13240 0

c  1+1 --> 2
c    (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0 ∧  p_378) -> (-b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0)
c  in CNF:
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_2
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨  b^{18, 22}_1
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ -p_378 ∨ -b^{18, 22}_0
c  in DIMACS:
 13235  13236 -13237 -378 -13238 0
 13235  13236 -13237 -378  13239 0
 13235  13236 -13237 -378 -13240 0

c  2+1 --> break 
c    (-b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧  p_378) -> break
c  in CNF:
c     b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 13235 -13236  13237 -378 1162 0


c  2-1 --> 1
c    (-b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧ -p_378) -> (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0)
c  in CNF:
c     b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_2
c     b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_1
c     b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨  b^{18, 22}_0
c  in DIMACS:
 13235 -13236  13237  378 -13238 0
 13235 -13236  13237  378 -13239 0
 13235 -13236  13237  378  13240 0

c  1-1 --> 0
c    (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0 ∧ -p_378) -> (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧ -b^{18, 22}_0)
c  in CNF:
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_2
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_1
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_0
c  in DIMACS:
 13235  13236 -13237  378 -13238 0
 13235  13236 -13237  378 -13239 0
 13235  13236 -13237  378 -13240 0

c  0-1 --> -1
c    (-b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧ -p_378) -> ( b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0)
c  in CNF:
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨  b^{18, 22}_2
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_1
c     b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨  b^{18, 22}_0
c  in DIMACS:
 13235  13236  13237  378  13238 0
 13235  13236  13237  378 -13239 0
 13235  13236  13237  378  13240 0

c  -1-1 --> -2
c    ( b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧  b^{18, 21}_0 ∧ -p_378) -> ( b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0)
c  in CNF:
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨  b^{18, 22}_2
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨  b^{18, 22}_1
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨  p_378 ∨ -b^{18, 22}_0
c  in DIMACS:
-13235  13236 -13237  378  13238 0
-13235  13236 -13237  378  13239 0
-13235  13236 -13237  378 -13240 0

c  -2-1 --> break 
c    ( b^{18, 21}_2 ∧  b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨  b^{18, 21}_0 ∨  p_378 ∨ break
c  in DIMACS:
-13235 -13236  13237  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 21}_2 ∧ -b^{18, 21}_1 ∧ -b^{18, 21}_0 ∧ true) 
c  in CNF:
c    -b^{18, 21}_2 ∨  b^{18, 21}_1 ∨  b^{18, 21}_0 ∨ false 
c  in DIMACS:
-13235  13236  13237  0

c  3 does not represent an automaton state.
c    -(-b^{18, 21}_2 ∧  b^{18, 21}_1 ∧  b^{18, 21}_0 ∧ true) 
c  in CNF:
c     b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ false 
c  in DIMACS:
 13235 -13236 -13237  0
c  -3 does not represent an automaton state.
c    -( b^{18, 21}_2 ∧  b^{18, 21}_1 ∧  b^{18, 21}_0 ∧ true) 
c  in CNF:
c    -b^{18, 21}_2 ∨ -b^{18, 21}_1 ∨ -b^{18, 21}_0 ∨ false 
c  in DIMACS:
-13235 -13236 -13237  0

c i = 22
c  -2+1 --> -1
c    ( b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧  p_396) -> ( b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0)
c  in CNF:
c    -b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨  b^{18, 23}_2
c    -b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_1
c    -b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨  b^{18, 23}_0
c  in DIMACS:
-13238 -13239  13240 -396  13241 0
-13238 -13239  13240 -396 -13242 0
-13238 -13239  13240 -396  13243 0

c  -1+1 --> 0
c    ( b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0 ∧  p_396) -> (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧ -b^{18, 23}_0)
c  in CNF:
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_2
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_1
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_0
c  in DIMACS:
-13238  13239 -13240 -396 -13241 0
-13238  13239 -13240 -396 -13242 0
-13238  13239 -13240 -396 -13243 0

c  0+1 --> 1
c    (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧  p_396) -> (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0)
c  in CNF:
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_2
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_1
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨  b^{18, 23}_0
c  in DIMACS:
 13238  13239  13240 -396 -13241 0
 13238  13239  13240 -396 -13242 0
 13238  13239  13240 -396  13243 0

c  1+1 --> 2
c    (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0 ∧  p_396) -> (-b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0)
c  in CNF:
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_2
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨  b^{18, 23}_1
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ -p_396 ∨ -b^{18, 23}_0
c  in DIMACS:
 13238  13239 -13240 -396 -13241 0
 13238  13239 -13240 -396  13242 0
 13238  13239 -13240 -396 -13243 0

c  2+1 --> break 
c    (-b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧  p_396) -> break
c  in CNF:
c     b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 13238 -13239  13240 -396 1162 0


c  2-1 --> 1
c    (-b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧ -p_396) -> (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0)
c  in CNF:
c     b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_2
c     b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_1
c     b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨  b^{18, 23}_0
c  in DIMACS:
 13238 -13239  13240  396 -13241 0
 13238 -13239  13240  396 -13242 0
 13238 -13239  13240  396  13243 0

c  1-1 --> 0
c    (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0 ∧ -p_396) -> (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧ -b^{18, 23}_0)
c  in CNF:
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_2
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_1
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_0
c  in DIMACS:
 13238  13239 -13240  396 -13241 0
 13238  13239 -13240  396 -13242 0
 13238  13239 -13240  396 -13243 0

c  0-1 --> -1
c    (-b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧ -p_396) -> ( b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0)
c  in CNF:
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨  b^{18, 23}_2
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_1
c     b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨  b^{18, 23}_0
c  in DIMACS:
 13238  13239  13240  396  13241 0
 13238  13239  13240  396 -13242 0
 13238  13239  13240  396  13243 0

c  -1-1 --> -2
c    ( b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧  b^{18, 22}_0 ∧ -p_396) -> ( b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0)
c  in CNF:
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨  b^{18, 23}_2
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨  b^{18, 23}_1
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨  p_396 ∨ -b^{18, 23}_0
c  in DIMACS:
-13238  13239 -13240  396  13241 0
-13238  13239 -13240  396  13242 0
-13238  13239 -13240  396 -13243 0

c  -2-1 --> break 
c    ( b^{18, 22}_2 ∧  b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨  b^{18, 22}_0 ∨  p_396 ∨ break
c  in DIMACS:
-13238 -13239  13240  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 22}_2 ∧ -b^{18, 22}_1 ∧ -b^{18, 22}_0 ∧ true) 
c  in CNF:
c    -b^{18, 22}_2 ∨  b^{18, 22}_1 ∨  b^{18, 22}_0 ∨ false 
c  in DIMACS:
-13238  13239  13240  0

c  3 does not represent an automaton state.
c    -(-b^{18, 22}_2 ∧  b^{18, 22}_1 ∧  b^{18, 22}_0 ∧ true) 
c  in CNF:
c     b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ false 
c  in DIMACS:
 13238 -13239 -13240  0
c  -3 does not represent an automaton state.
c    -( b^{18, 22}_2 ∧  b^{18, 22}_1 ∧  b^{18, 22}_0 ∧ true) 
c  in CNF:
c    -b^{18, 22}_2 ∨ -b^{18, 22}_1 ∨ -b^{18, 22}_0 ∨ false 
c  in DIMACS:
-13238 -13239 -13240  0

c i = 23
c  -2+1 --> -1
c    ( b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧  p_414) -> ( b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0)
c  in CNF:
c    -b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨  b^{18, 24}_2
c    -b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_1
c    -b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨  b^{18, 24}_0
c  in DIMACS:
-13241 -13242  13243 -414  13244 0
-13241 -13242  13243 -414 -13245 0
-13241 -13242  13243 -414  13246 0

c  -1+1 --> 0
c    ( b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0 ∧  p_414) -> (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧ -b^{18, 24}_0)
c  in CNF:
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_2
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_1
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_0
c  in DIMACS:
-13241  13242 -13243 -414 -13244 0
-13241  13242 -13243 -414 -13245 0
-13241  13242 -13243 -414 -13246 0

c  0+1 --> 1
c    (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧  p_414) -> (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0)
c  in CNF:
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_2
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_1
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨  b^{18, 24}_0
c  in DIMACS:
 13241  13242  13243 -414 -13244 0
 13241  13242  13243 -414 -13245 0
 13241  13242  13243 -414  13246 0

c  1+1 --> 2
c    (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0 ∧  p_414) -> (-b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0)
c  in CNF:
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_2
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨  b^{18, 24}_1
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ -p_414 ∨ -b^{18, 24}_0
c  in DIMACS:
 13241  13242 -13243 -414 -13244 0
 13241  13242 -13243 -414  13245 0
 13241  13242 -13243 -414 -13246 0

c  2+1 --> break 
c    (-b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧  p_414) -> break
c  in CNF:
c     b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 13241 -13242  13243 -414 1162 0


c  2-1 --> 1
c    (-b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧ -p_414) -> (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0)
c  in CNF:
c     b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_2
c     b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_1
c     b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨  b^{18, 24}_0
c  in DIMACS:
 13241 -13242  13243  414 -13244 0
 13241 -13242  13243  414 -13245 0
 13241 -13242  13243  414  13246 0

c  1-1 --> 0
c    (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0 ∧ -p_414) -> (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧ -b^{18, 24}_0)
c  in CNF:
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_2
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_1
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_0
c  in DIMACS:
 13241  13242 -13243  414 -13244 0
 13241  13242 -13243  414 -13245 0
 13241  13242 -13243  414 -13246 0

c  0-1 --> -1
c    (-b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧ -p_414) -> ( b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0)
c  in CNF:
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨  b^{18, 24}_2
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_1
c     b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨  b^{18, 24}_0
c  in DIMACS:
 13241  13242  13243  414  13244 0
 13241  13242  13243  414 -13245 0
 13241  13242  13243  414  13246 0

c  -1-1 --> -2
c    ( b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧  b^{18, 23}_0 ∧ -p_414) -> ( b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0)
c  in CNF:
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨  b^{18, 24}_2
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨  b^{18, 24}_1
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨  p_414 ∨ -b^{18, 24}_0
c  in DIMACS:
-13241  13242 -13243  414  13244 0
-13241  13242 -13243  414  13245 0
-13241  13242 -13243  414 -13246 0

c  -2-1 --> break 
c    ( b^{18, 23}_2 ∧  b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨  b^{18, 23}_0 ∨  p_414 ∨ break
c  in DIMACS:
-13241 -13242  13243  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 23}_2 ∧ -b^{18, 23}_1 ∧ -b^{18, 23}_0 ∧ true) 
c  in CNF:
c    -b^{18, 23}_2 ∨  b^{18, 23}_1 ∨  b^{18, 23}_0 ∨ false 
c  in DIMACS:
-13241  13242  13243  0

c  3 does not represent an automaton state.
c    -(-b^{18, 23}_2 ∧  b^{18, 23}_1 ∧  b^{18, 23}_0 ∧ true) 
c  in CNF:
c     b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ false 
c  in DIMACS:
 13241 -13242 -13243  0
c  -3 does not represent an automaton state.
c    -( b^{18, 23}_2 ∧  b^{18, 23}_1 ∧  b^{18, 23}_0 ∧ true) 
c  in CNF:
c    -b^{18, 23}_2 ∨ -b^{18, 23}_1 ∨ -b^{18, 23}_0 ∨ false 
c  in DIMACS:
-13241 -13242 -13243  0

c i = 24
c  -2+1 --> -1
c    ( b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧  p_432) -> ( b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0)
c  in CNF:
c    -b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨  b^{18, 25}_2
c    -b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_1
c    -b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨  b^{18, 25}_0
c  in DIMACS:
-13244 -13245  13246 -432  13247 0
-13244 -13245  13246 -432 -13248 0
-13244 -13245  13246 -432  13249 0

c  -1+1 --> 0
c    ( b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0 ∧  p_432) -> (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧ -b^{18, 25}_0)
c  in CNF:
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_2
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_1
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_0
c  in DIMACS:
-13244  13245 -13246 -432 -13247 0
-13244  13245 -13246 -432 -13248 0
-13244  13245 -13246 -432 -13249 0

c  0+1 --> 1
c    (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧  p_432) -> (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0)
c  in CNF:
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_2
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_1
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨  b^{18, 25}_0
c  in DIMACS:
 13244  13245  13246 -432 -13247 0
 13244  13245  13246 -432 -13248 0
 13244  13245  13246 -432  13249 0

c  1+1 --> 2
c    (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0 ∧  p_432) -> (-b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0)
c  in CNF:
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_2
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨  b^{18, 25}_1
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ -p_432 ∨ -b^{18, 25}_0
c  in DIMACS:
 13244  13245 -13246 -432 -13247 0
 13244  13245 -13246 -432  13248 0
 13244  13245 -13246 -432 -13249 0

c  2+1 --> break 
c    (-b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧  p_432) -> break
c  in CNF:
c     b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 13244 -13245  13246 -432 1162 0


c  2-1 --> 1
c    (-b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧ -p_432) -> (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0)
c  in CNF:
c     b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_2
c     b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_1
c     b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨  b^{18, 25}_0
c  in DIMACS:
 13244 -13245  13246  432 -13247 0
 13244 -13245  13246  432 -13248 0
 13244 -13245  13246  432  13249 0

c  1-1 --> 0
c    (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0 ∧ -p_432) -> (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧ -b^{18, 25}_0)
c  in CNF:
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_2
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_1
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_0
c  in DIMACS:
 13244  13245 -13246  432 -13247 0
 13244  13245 -13246  432 -13248 0
 13244  13245 -13246  432 -13249 0

c  0-1 --> -1
c    (-b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧ -p_432) -> ( b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0)
c  in CNF:
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨  b^{18, 25}_2
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_1
c     b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨  b^{18, 25}_0
c  in DIMACS:
 13244  13245  13246  432  13247 0
 13244  13245  13246  432 -13248 0
 13244  13245  13246  432  13249 0

c  -1-1 --> -2
c    ( b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧  b^{18, 24}_0 ∧ -p_432) -> ( b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0)
c  in CNF:
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨  b^{18, 25}_2
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨  b^{18, 25}_1
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨  p_432 ∨ -b^{18, 25}_0
c  in DIMACS:
-13244  13245 -13246  432  13247 0
-13244  13245 -13246  432  13248 0
-13244  13245 -13246  432 -13249 0

c  -2-1 --> break 
c    ( b^{18, 24}_2 ∧  b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨  b^{18, 24}_0 ∨  p_432 ∨ break
c  in DIMACS:
-13244 -13245  13246  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 24}_2 ∧ -b^{18, 24}_1 ∧ -b^{18, 24}_0 ∧ true) 
c  in CNF:
c    -b^{18, 24}_2 ∨  b^{18, 24}_1 ∨  b^{18, 24}_0 ∨ false 
c  in DIMACS:
-13244  13245  13246  0

c  3 does not represent an automaton state.
c    -(-b^{18, 24}_2 ∧  b^{18, 24}_1 ∧  b^{18, 24}_0 ∧ true) 
c  in CNF:
c     b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ false 
c  in DIMACS:
 13244 -13245 -13246  0
c  -3 does not represent an automaton state.
c    -( b^{18, 24}_2 ∧  b^{18, 24}_1 ∧  b^{18, 24}_0 ∧ true) 
c  in CNF:
c    -b^{18, 24}_2 ∨ -b^{18, 24}_1 ∨ -b^{18, 24}_0 ∨ false 
c  in DIMACS:
-13244 -13245 -13246  0

c i = 25
c  -2+1 --> -1
c    ( b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧  p_450) -> ( b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0)
c  in CNF:
c    -b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨  b^{18, 26}_2
c    -b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_1
c    -b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨  b^{18, 26}_0
c  in DIMACS:
-13247 -13248  13249 -450  13250 0
-13247 -13248  13249 -450 -13251 0
-13247 -13248  13249 -450  13252 0

c  -1+1 --> 0
c    ( b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0 ∧  p_450) -> (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧ -b^{18, 26}_0)
c  in CNF:
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_2
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_1
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_0
c  in DIMACS:
-13247  13248 -13249 -450 -13250 0
-13247  13248 -13249 -450 -13251 0
-13247  13248 -13249 -450 -13252 0

c  0+1 --> 1
c    (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧  p_450) -> (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0)
c  in CNF:
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_2
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_1
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨  b^{18, 26}_0
c  in DIMACS:
 13247  13248  13249 -450 -13250 0
 13247  13248  13249 -450 -13251 0
 13247  13248  13249 -450  13252 0

c  1+1 --> 2
c    (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0 ∧  p_450) -> (-b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0)
c  in CNF:
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_2
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨  b^{18, 26}_1
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ -p_450 ∨ -b^{18, 26}_0
c  in DIMACS:
 13247  13248 -13249 -450 -13250 0
 13247  13248 -13249 -450  13251 0
 13247  13248 -13249 -450 -13252 0

c  2+1 --> break 
c    (-b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧  p_450) -> break
c  in CNF:
c     b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 13247 -13248  13249 -450 1162 0


c  2-1 --> 1
c    (-b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧ -p_450) -> (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0)
c  in CNF:
c     b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_2
c     b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_1
c     b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨  b^{18, 26}_0
c  in DIMACS:
 13247 -13248  13249  450 -13250 0
 13247 -13248  13249  450 -13251 0
 13247 -13248  13249  450  13252 0

c  1-1 --> 0
c    (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0 ∧ -p_450) -> (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧ -b^{18, 26}_0)
c  in CNF:
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_2
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_1
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_0
c  in DIMACS:
 13247  13248 -13249  450 -13250 0
 13247  13248 -13249  450 -13251 0
 13247  13248 -13249  450 -13252 0

c  0-1 --> -1
c    (-b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧ -p_450) -> ( b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0)
c  in CNF:
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨  b^{18, 26}_2
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_1
c     b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨  b^{18, 26}_0
c  in DIMACS:
 13247  13248  13249  450  13250 0
 13247  13248  13249  450 -13251 0
 13247  13248  13249  450  13252 0

c  -1-1 --> -2
c    ( b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧  b^{18, 25}_0 ∧ -p_450) -> ( b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0)
c  in CNF:
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨  b^{18, 26}_2
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨  b^{18, 26}_1
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨  p_450 ∨ -b^{18, 26}_0
c  in DIMACS:
-13247  13248 -13249  450  13250 0
-13247  13248 -13249  450  13251 0
-13247  13248 -13249  450 -13252 0

c  -2-1 --> break 
c    ( b^{18, 25}_2 ∧  b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨  b^{18, 25}_0 ∨  p_450 ∨ break
c  in DIMACS:
-13247 -13248  13249  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 25}_2 ∧ -b^{18, 25}_1 ∧ -b^{18, 25}_0 ∧ true) 
c  in CNF:
c    -b^{18, 25}_2 ∨  b^{18, 25}_1 ∨  b^{18, 25}_0 ∨ false 
c  in DIMACS:
-13247  13248  13249  0

c  3 does not represent an automaton state.
c    -(-b^{18, 25}_2 ∧  b^{18, 25}_1 ∧  b^{18, 25}_0 ∧ true) 
c  in CNF:
c     b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ false 
c  in DIMACS:
 13247 -13248 -13249  0
c  -3 does not represent an automaton state.
c    -( b^{18, 25}_2 ∧  b^{18, 25}_1 ∧  b^{18, 25}_0 ∧ true) 
c  in CNF:
c    -b^{18, 25}_2 ∨ -b^{18, 25}_1 ∨ -b^{18, 25}_0 ∨ false 
c  in DIMACS:
-13247 -13248 -13249  0

c i = 26
c  -2+1 --> -1
c    ( b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧  p_468) -> ( b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0)
c  in CNF:
c    -b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨  b^{18, 27}_2
c    -b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_1
c    -b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨  b^{18, 27}_0
c  in DIMACS:
-13250 -13251  13252 -468  13253 0
-13250 -13251  13252 -468 -13254 0
-13250 -13251  13252 -468  13255 0

c  -1+1 --> 0
c    ( b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0 ∧  p_468) -> (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧ -b^{18, 27}_0)
c  in CNF:
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_2
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_1
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_0
c  in DIMACS:
-13250  13251 -13252 -468 -13253 0
-13250  13251 -13252 -468 -13254 0
-13250  13251 -13252 -468 -13255 0

c  0+1 --> 1
c    (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧  p_468) -> (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0)
c  in CNF:
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_2
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_1
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨  b^{18, 27}_0
c  in DIMACS:
 13250  13251  13252 -468 -13253 0
 13250  13251  13252 -468 -13254 0
 13250  13251  13252 -468  13255 0

c  1+1 --> 2
c    (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0 ∧  p_468) -> (-b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0)
c  in CNF:
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_2
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨  b^{18, 27}_1
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ -p_468 ∨ -b^{18, 27}_0
c  in DIMACS:
 13250  13251 -13252 -468 -13253 0
 13250  13251 -13252 -468  13254 0
 13250  13251 -13252 -468 -13255 0

c  2+1 --> break 
c    (-b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧  p_468) -> break
c  in CNF:
c     b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 13250 -13251  13252 -468 1162 0


c  2-1 --> 1
c    (-b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧ -p_468) -> (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0)
c  in CNF:
c     b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_2
c     b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_1
c     b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨  b^{18, 27}_0
c  in DIMACS:
 13250 -13251  13252  468 -13253 0
 13250 -13251  13252  468 -13254 0
 13250 -13251  13252  468  13255 0

c  1-1 --> 0
c    (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0 ∧ -p_468) -> (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧ -b^{18, 27}_0)
c  in CNF:
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_2
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_1
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_0
c  in DIMACS:
 13250  13251 -13252  468 -13253 0
 13250  13251 -13252  468 -13254 0
 13250  13251 -13252  468 -13255 0

c  0-1 --> -1
c    (-b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧ -p_468) -> ( b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0)
c  in CNF:
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨  b^{18, 27}_2
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_1
c     b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨  b^{18, 27}_0
c  in DIMACS:
 13250  13251  13252  468  13253 0
 13250  13251  13252  468 -13254 0
 13250  13251  13252  468  13255 0

c  -1-1 --> -2
c    ( b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧  b^{18, 26}_0 ∧ -p_468) -> ( b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0)
c  in CNF:
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨  b^{18, 27}_2
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨  b^{18, 27}_1
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨  p_468 ∨ -b^{18, 27}_0
c  in DIMACS:
-13250  13251 -13252  468  13253 0
-13250  13251 -13252  468  13254 0
-13250  13251 -13252  468 -13255 0

c  -2-1 --> break 
c    ( b^{18, 26}_2 ∧  b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨  b^{18, 26}_0 ∨  p_468 ∨ break
c  in DIMACS:
-13250 -13251  13252  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 26}_2 ∧ -b^{18, 26}_1 ∧ -b^{18, 26}_0 ∧ true) 
c  in CNF:
c    -b^{18, 26}_2 ∨  b^{18, 26}_1 ∨  b^{18, 26}_0 ∨ false 
c  in DIMACS:
-13250  13251  13252  0

c  3 does not represent an automaton state.
c    -(-b^{18, 26}_2 ∧  b^{18, 26}_1 ∧  b^{18, 26}_0 ∧ true) 
c  in CNF:
c     b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ false 
c  in DIMACS:
 13250 -13251 -13252  0
c  -3 does not represent an automaton state.
c    -( b^{18, 26}_2 ∧  b^{18, 26}_1 ∧  b^{18, 26}_0 ∧ true) 
c  in CNF:
c    -b^{18, 26}_2 ∨ -b^{18, 26}_1 ∨ -b^{18, 26}_0 ∨ false 
c  in DIMACS:
-13250 -13251 -13252  0

c i = 27
c  -2+1 --> -1
c    ( b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧  p_486) -> ( b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0)
c  in CNF:
c    -b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨  b^{18, 28}_2
c    -b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_1
c    -b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨  b^{18, 28}_0
c  in DIMACS:
-13253 -13254  13255 -486  13256 0
-13253 -13254  13255 -486 -13257 0
-13253 -13254  13255 -486  13258 0

c  -1+1 --> 0
c    ( b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0 ∧  p_486) -> (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧ -b^{18, 28}_0)
c  in CNF:
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_2
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_1
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_0
c  in DIMACS:
-13253  13254 -13255 -486 -13256 0
-13253  13254 -13255 -486 -13257 0
-13253  13254 -13255 -486 -13258 0

c  0+1 --> 1
c    (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧  p_486) -> (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0)
c  in CNF:
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_2
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_1
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨  b^{18, 28}_0
c  in DIMACS:
 13253  13254  13255 -486 -13256 0
 13253  13254  13255 -486 -13257 0
 13253  13254  13255 -486  13258 0

c  1+1 --> 2
c    (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0 ∧  p_486) -> (-b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0)
c  in CNF:
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_2
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨  b^{18, 28}_1
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ -p_486 ∨ -b^{18, 28}_0
c  in DIMACS:
 13253  13254 -13255 -486 -13256 0
 13253  13254 -13255 -486  13257 0
 13253  13254 -13255 -486 -13258 0

c  2+1 --> break 
c    (-b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧  p_486) -> break
c  in CNF:
c     b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 13253 -13254  13255 -486 1162 0


c  2-1 --> 1
c    (-b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧ -p_486) -> (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0)
c  in CNF:
c     b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_2
c     b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_1
c     b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨  b^{18, 28}_0
c  in DIMACS:
 13253 -13254  13255  486 -13256 0
 13253 -13254  13255  486 -13257 0
 13253 -13254  13255  486  13258 0

c  1-1 --> 0
c    (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0 ∧ -p_486) -> (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧ -b^{18, 28}_0)
c  in CNF:
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_2
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_1
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_0
c  in DIMACS:
 13253  13254 -13255  486 -13256 0
 13253  13254 -13255  486 -13257 0
 13253  13254 -13255  486 -13258 0

c  0-1 --> -1
c    (-b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧ -p_486) -> ( b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0)
c  in CNF:
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨  b^{18, 28}_2
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_1
c     b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨  b^{18, 28}_0
c  in DIMACS:
 13253  13254  13255  486  13256 0
 13253  13254  13255  486 -13257 0
 13253  13254  13255  486  13258 0

c  -1-1 --> -2
c    ( b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧  b^{18, 27}_0 ∧ -p_486) -> ( b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0)
c  in CNF:
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨  b^{18, 28}_2
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨  b^{18, 28}_1
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨  p_486 ∨ -b^{18, 28}_0
c  in DIMACS:
-13253  13254 -13255  486  13256 0
-13253  13254 -13255  486  13257 0
-13253  13254 -13255  486 -13258 0

c  -2-1 --> break 
c    ( b^{18, 27}_2 ∧  b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨  b^{18, 27}_0 ∨  p_486 ∨ break
c  in DIMACS:
-13253 -13254  13255  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 27}_2 ∧ -b^{18, 27}_1 ∧ -b^{18, 27}_0 ∧ true) 
c  in CNF:
c    -b^{18, 27}_2 ∨  b^{18, 27}_1 ∨  b^{18, 27}_0 ∨ false 
c  in DIMACS:
-13253  13254  13255  0

c  3 does not represent an automaton state.
c    -(-b^{18, 27}_2 ∧  b^{18, 27}_1 ∧  b^{18, 27}_0 ∧ true) 
c  in CNF:
c     b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ false 
c  in DIMACS:
 13253 -13254 -13255  0
c  -3 does not represent an automaton state.
c    -( b^{18, 27}_2 ∧  b^{18, 27}_1 ∧  b^{18, 27}_0 ∧ true) 
c  in CNF:
c    -b^{18, 27}_2 ∨ -b^{18, 27}_1 ∨ -b^{18, 27}_0 ∨ false 
c  in DIMACS:
-13253 -13254 -13255  0

c i = 28
c  -2+1 --> -1
c    ( b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧  p_504) -> ( b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0)
c  in CNF:
c    -b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨  b^{18, 29}_2
c    -b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_1
c    -b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨  b^{18, 29}_0
c  in DIMACS:
-13256 -13257  13258 -504  13259 0
-13256 -13257  13258 -504 -13260 0
-13256 -13257  13258 -504  13261 0

c  -1+1 --> 0
c    ( b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0 ∧  p_504) -> (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧ -b^{18, 29}_0)
c  in CNF:
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_2
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_1
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_0
c  in DIMACS:
-13256  13257 -13258 -504 -13259 0
-13256  13257 -13258 -504 -13260 0
-13256  13257 -13258 -504 -13261 0

c  0+1 --> 1
c    (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧  p_504) -> (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0)
c  in CNF:
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_2
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_1
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨  b^{18, 29}_0
c  in DIMACS:
 13256  13257  13258 -504 -13259 0
 13256  13257  13258 -504 -13260 0
 13256  13257  13258 -504  13261 0

c  1+1 --> 2
c    (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0 ∧  p_504) -> (-b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0)
c  in CNF:
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_2
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨  b^{18, 29}_1
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ -p_504 ∨ -b^{18, 29}_0
c  in DIMACS:
 13256  13257 -13258 -504 -13259 0
 13256  13257 -13258 -504  13260 0
 13256  13257 -13258 -504 -13261 0

c  2+1 --> break 
c    (-b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧  p_504) -> break
c  in CNF:
c     b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 13256 -13257  13258 -504 1162 0


c  2-1 --> 1
c    (-b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧ -p_504) -> (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0)
c  in CNF:
c     b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_2
c     b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_1
c     b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨  b^{18, 29}_0
c  in DIMACS:
 13256 -13257  13258  504 -13259 0
 13256 -13257  13258  504 -13260 0
 13256 -13257  13258  504  13261 0

c  1-1 --> 0
c    (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0 ∧ -p_504) -> (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧ -b^{18, 29}_0)
c  in CNF:
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_2
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_1
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_0
c  in DIMACS:
 13256  13257 -13258  504 -13259 0
 13256  13257 -13258  504 -13260 0
 13256  13257 -13258  504 -13261 0

c  0-1 --> -1
c    (-b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧ -p_504) -> ( b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0)
c  in CNF:
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨  b^{18, 29}_2
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_1
c     b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨  b^{18, 29}_0
c  in DIMACS:
 13256  13257  13258  504  13259 0
 13256  13257  13258  504 -13260 0
 13256  13257  13258  504  13261 0

c  -1-1 --> -2
c    ( b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧  b^{18, 28}_0 ∧ -p_504) -> ( b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0)
c  in CNF:
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨  b^{18, 29}_2
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨  b^{18, 29}_1
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨  p_504 ∨ -b^{18, 29}_0
c  in DIMACS:
-13256  13257 -13258  504  13259 0
-13256  13257 -13258  504  13260 0
-13256  13257 -13258  504 -13261 0

c  -2-1 --> break 
c    ( b^{18, 28}_2 ∧  b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨  b^{18, 28}_0 ∨  p_504 ∨ break
c  in DIMACS:
-13256 -13257  13258  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 28}_2 ∧ -b^{18, 28}_1 ∧ -b^{18, 28}_0 ∧ true) 
c  in CNF:
c    -b^{18, 28}_2 ∨  b^{18, 28}_1 ∨  b^{18, 28}_0 ∨ false 
c  in DIMACS:
-13256  13257  13258  0

c  3 does not represent an automaton state.
c    -(-b^{18, 28}_2 ∧  b^{18, 28}_1 ∧  b^{18, 28}_0 ∧ true) 
c  in CNF:
c     b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ false 
c  in DIMACS:
 13256 -13257 -13258  0
c  -3 does not represent an automaton state.
c    -( b^{18, 28}_2 ∧  b^{18, 28}_1 ∧  b^{18, 28}_0 ∧ true) 
c  in CNF:
c    -b^{18, 28}_2 ∨ -b^{18, 28}_1 ∨ -b^{18, 28}_0 ∨ false 
c  in DIMACS:
-13256 -13257 -13258  0

c i = 29
c  -2+1 --> -1
c    ( b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧  p_522) -> ( b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0)
c  in CNF:
c    -b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨  b^{18, 30}_2
c    -b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_1
c    -b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨  b^{18, 30}_0
c  in DIMACS:
-13259 -13260  13261 -522  13262 0
-13259 -13260  13261 -522 -13263 0
-13259 -13260  13261 -522  13264 0

c  -1+1 --> 0
c    ( b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0 ∧  p_522) -> (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧ -b^{18, 30}_0)
c  in CNF:
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_2
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_1
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_0
c  in DIMACS:
-13259  13260 -13261 -522 -13262 0
-13259  13260 -13261 -522 -13263 0
-13259  13260 -13261 -522 -13264 0

c  0+1 --> 1
c    (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧  p_522) -> (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0)
c  in CNF:
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_2
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_1
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨  b^{18, 30}_0
c  in DIMACS:
 13259  13260  13261 -522 -13262 0
 13259  13260  13261 -522 -13263 0
 13259  13260  13261 -522  13264 0

c  1+1 --> 2
c    (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0 ∧  p_522) -> (-b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0)
c  in CNF:
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_2
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨  b^{18, 30}_1
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ -p_522 ∨ -b^{18, 30}_0
c  in DIMACS:
 13259  13260 -13261 -522 -13262 0
 13259  13260 -13261 -522  13263 0
 13259  13260 -13261 -522 -13264 0

c  2+1 --> break 
c    (-b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧  p_522) -> break
c  in CNF:
c     b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 13259 -13260  13261 -522 1162 0


c  2-1 --> 1
c    (-b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧ -p_522) -> (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0)
c  in CNF:
c     b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_2
c     b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_1
c     b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨  b^{18, 30}_0
c  in DIMACS:
 13259 -13260  13261  522 -13262 0
 13259 -13260  13261  522 -13263 0
 13259 -13260  13261  522  13264 0

c  1-1 --> 0
c    (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0 ∧ -p_522) -> (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧ -b^{18, 30}_0)
c  in CNF:
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_2
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_1
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_0
c  in DIMACS:
 13259  13260 -13261  522 -13262 0
 13259  13260 -13261  522 -13263 0
 13259  13260 -13261  522 -13264 0

c  0-1 --> -1
c    (-b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧ -p_522) -> ( b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0)
c  in CNF:
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨  b^{18, 30}_2
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_1
c     b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨  b^{18, 30}_0
c  in DIMACS:
 13259  13260  13261  522  13262 0
 13259  13260  13261  522 -13263 0
 13259  13260  13261  522  13264 0

c  -1-1 --> -2
c    ( b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧  b^{18, 29}_0 ∧ -p_522) -> ( b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0)
c  in CNF:
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨  b^{18, 30}_2
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨  b^{18, 30}_1
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨  p_522 ∨ -b^{18, 30}_0
c  in DIMACS:
-13259  13260 -13261  522  13262 0
-13259  13260 -13261  522  13263 0
-13259  13260 -13261  522 -13264 0

c  -2-1 --> break 
c    ( b^{18, 29}_2 ∧  b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨  b^{18, 29}_0 ∨  p_522 ∨ break
c  in DIMACS:
-13259 -13260  13261  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 29}_2 ∧ -b^{18, 29}_1 ∧ -b^{18, 29}_0 ∧ true) 
c  in CNF:
c    -b^{18, 29}_2 ∨  b^{18, 29}_1 ∨  b^{18, 29}_0 ∨ false 
c  in DIMACS:
-13259  13260  13261  0

c  3 does not represent an automaton state.
c    -(-b^{18, 29}_2 ∧  b^{18, 29}_1 ∧  b^{18, 29}_0 ∧ true) 
c  in CNF:
c     b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ false 
c  in DIMACS:
 13259 -13260 -13261  0
c  -3 does not represent an automaton state.
c    -( b^{18, 29}_2 ∧  b^{18, 29}_1 ∧  b^{18, 29}_0 ∧ true) 
c  in CNF:
c    -b^{18, 29}_2 ∨ -b^{18, 29}_1 ∨ -b^{18, 29}_0 ∨ false 
c  in DIMACS:
-13259 -13260 -13261  0

c i = 30
c  -2+1 --> -1
c    ( b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧  p_540) -> ( b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0)
c  in CNF:
c    -b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨  b^{18, 31}_2
c    -b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_1
c    -b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨  b^{18, 31}_0
c  in DIMACS:
-13262 -13263  13264 -540  13265 0
-13262 -13263  13264 -540 -13266 0
-13262 -13263  13264 -540  13267 0

c  -1+1 --> 0
c    ( b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0 ∧  p_540) -> (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧ -b^{18, 31}_0)
c  in CNF:
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_2
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_1
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_0
c  in DIMACS:
-13262  13263 -13264 -540 -13265 0
-13262  13263 -13264 -540 -13266 0
-13262  13263 -13264 -540 -13267 0

c  0+1 --> 1
c    (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧  p_540) -> (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0)
c  in CNF:
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_2
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_1
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨  b^{18, 31}_0
c  in DIMACS:
 13262  13263  13264 -540 -13265 0
 13262  13263  13264 -540 -13266 0
 13262  13263  13264 -540  13267 0

c  1+1 --> 2
c    (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0 ∧  p_540) -> (-b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0)
c  in CNF:
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_2
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨  b^{18, 31}_1
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ -p_540 ∨ -b^{18, 31}_0
c  in DIMACS:
 13262  13263 -13264 -540 -13265 0
 13262  13263 -13264 -540  13266 0
 13262  13263 -13264 -540 -13267 0

c  2+1 --> break 
c    (-b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧  p_540) -> break
c  in CNF:
c     b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 13262 -13263  13264 -540 1162 0


c  2-1 --> 1
c    (-b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧ -p_540) -> (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0)
c  in CNF:
c     b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_2
c     b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_1
c     b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨  b^{18, 31}_0
c  in DIMACS:
 13262 -13263  13264  540 -13265 0
 13262 -13263  13264  540 -13266 0
 13262 -13263  13264  540  13267 0

c  1-1 --> 0
c    (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0 ∧ -p_540) -> (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧ -b^{18, 31}_0)
c  in CNF:
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_2
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_1
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_0
c  in DIMACS:
 13262  13263 -13264  540 -13265 0
 13262  13263 -13264  540 -13266 0
 13262  13263 -13264  540 -13267 0

c  0-1 --> -1
c    (-b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧ -p_540) -> ( b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0)
c  in CNF:
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨  b^{18, 31}_2
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_1
c     b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨  b^{18, 31}_0
c  in DIMACS:
 13262  13263  13264  540  13265 0
 13262  13263  13264  540 -13266 0
 13262  13263  13264  540  13267 0

c  -1-1 --> -2
c    ( b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧  b^{18, 30}_0 ∧ -p_540) -> ( b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0)
c  in CNF:
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨  b^{18, 31}_2
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨  b^{18, 31}_1
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨  p_540 ∨ -b^{18, 31}_0
c  in DIMACS:
-13262  13263 -13264  540  13265 0
-13262  13263 -13264  540  13266 0
-13262  13263 -13264  540 -13267 0

c  -2-1 --> break 
c    ( b^{18, 30}_2 ∧  b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨  b^{18, 30}_0 ∨  p_540 ∨ break
c  in DIMACS:
-13262 -13263  13264  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 30}_2 ∧ -b^{18, 30}_1 ∧ -b^{18, 30}_0 ∧ true) 
c  in CNF:
c    -b^{18, 30}_2 ∨  b^{18, 30}_1 ∨  b^{18, 30}_0 ∨ false 
c  in DIMACS:
-13262  13263  13264  0

c  3 does not represent an automaton state.
c    -(-b^{18, 30}_2 ∧  b^{18, 30}_1 ∧  b^{18, 30}_0 ∧ true) 
c  in CNF:
c     b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ false 
c  in DIMACS:
 13262 -13263 -13264  0
c  -3 does not represent an automaton state.
c    -( b^{18, 30}_2 ∧  b^{18, 30}_1 ∧  b^{18, 30}_0 ∧ true) 
c  in CNF:
c    -b^{18, 30}_2 ∨ -b^{18, 30}_1 ∨ -b^{18, 30}_0 ∨ false 
c  in DIMACS:
-13262 -13263 -13264  0

c i = 31
c  -2+1 --> -1
c    ( b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧  p_558) -> ( b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0)
c  in CNF:
c    -b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨  b^{18, 32}_2
c    -b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_1
c    -b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨  b^{18, 32}_0
c  in DIMACS:
-13265 -13266  13267 -558  13268 0
-13265 -13266  13267 -558 -13269 0
-13265 -13266  13267 -558  13270 0

c  -1+1 --> 0
c    ( b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0 ∧  p_558) -> (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧ -b^{18, 32}_0)
c  in CNF:
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_2
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_1
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_0
c  in DIMACS:
-13265  13266 -13267 -558 -13268 0
-13265  13266 -13267 -558 -13269 0
-13265  13266 -13267 -558 -13270 0

c  0+1 --> 1
c    (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧  p_558) -> (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0)
c  in CNF:
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_2
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_1
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨  b^{18, 32}_0
c  in DIMACS:
 13265  13266  13267 -558 -13268 0
 13265  13266  13267 -558 -13269 0
 13265  13266  13267 -558  13270 0

c  1+1 --> 2
c    (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0 ∧  p_558) -> (-b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0)
c  in CNF:
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_2
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨  b^{18, 32}_1
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ -p_558 ∨ -b^{18, 32}_0
c  in DIMACS:
 13265  13266 -13267 -558 -13268 0
 13265  13266 -13267 -558  13269 0
 13265  13266 -13267 -558 -13270 0

c  2+1 --> break 
c    (-b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧  p_558) -> break
c  in CNF:
c     b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 13265 -13266  13267 -558 1162 0


c  2-1 --> 1
c    (-b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧ -p_558) -> (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0)
c  in CNF:
c     b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_2
c     b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_1
c     b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨  b^{18, 32}_0
c  in DIMACS:
 13265 -13266  13267  558 -13268 0
 13265 -13266  13267  558 -13269 0
 13265 -13266  13267  558  13270 0

c  1-1 --> 0
c    (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0 ∧ -p_558) -> (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧ -b^{18, 32}_0)
c  in CNF:
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_2
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_1
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_0
c  in DIMACS:
 13265  13266 -13267  558 -13268 0
 13265  13266 -13267  558 -13269 0
 13265  13266 -13267  558 -13270 0

c  0-1 --> -1
c    (-b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧ -p_558) -> ( b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0)
c  in CNF:
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨  b^{18, 32}_2
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_1
c     b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨  b^{18, 32}_0
c  in DIMACS:
 13265  13266  13267  558  13268 0
 13265  13266  13267  558 -13269 0
 13265  13266  13267  558  13270 0

c  -1-1 --> -2
c    ( b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧  b^{18, 31}_0 ∧ -p_558) -> ( b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0)
c  in CNF:
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨  b^{18, 32}_2
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨  b^{18, 32}_1
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨  p_558 ∨ -b^{18, 32}_0
c  in DIMACS:
-13265  13266 -13267  558  13268 0
-13265  13266 -13267  558  13269 0
-13265  13266 -13267  558 -13270 0

c  -2-1 --> break 
c    ( b^{18, 31}_2 ∧  b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨  b^{18, 31}_0 ∨  p_558 ∨ break
c  in DIMACS:
-13265 -13266  13267  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 31}_2 ∧ -b^{18, 31}_1 ∧ -b^{18, 31}_0 ∧ true) 
c  in CNF:
c    -b^{18, 31}_2 ∨  b^{18, 31}_1 ∨  b^{18, 31}_0 ∨ false 
c  in DIMACS:
-13265  13266  13267  0

c  3 does not represent an automaton state.
c    -(-b^{18, 31}_2 ∧  b^{18, 31}_1 ∧  b^{18, 31}_0 ∧ true) 
c  in CNF:
c     b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ false 
c  in DIMACS:
 13265 -13266 -13267  0
c  -3 does not represent an automaton state.
c    -( b^{18, 31}_2 ∧  b^{18, 31}_1 ∧  b^{18, 31}_0 ∧ true) 
c  in CNF:
c    -b^{18, 31}_2 ∨ -b^{18, 31}_1 ∨ -b^{18, 31}_0 ∨ false 
c  in DIMACS:
-13265 -13266 -13267  0

c i = 32
c  -2+1 --> -1
c    ( b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧  p_576) -> ( b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0)
c  in CNF:
c    -b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨  b^{18, 33}_2
c    -b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_1
c    -b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨  b^{18, 33}_0
c  in DIMACS:
-13268 -13269  13270 -576  13271 0
-13268 -13269  13270 -576 -13272 0
-13268 -13269  13270 -576  13273 0

c  -1+1 --> 0
c    ( b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0 ∧  p_576) -> (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧ -b^{18, 33}_0)
c  in CNF:
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_2
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_1
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_0
c  in DIMACS:
-13268  13269 -13270 -576 -13271 0
-13268  13269 -13270 -576 -13272 0
-13268  13269 -13270 -576 -13273 0

c  0+1 --> 1
c    (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧  p_576) -> (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0)
c  in CNF:
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_2
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_1
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨  b^{18, 33}_0
c  in DIMACS:
 13268  13269  13270 -576 -13271 0
 13268  13269  13270 -576 -13272 0
 13268  13269  13270 -576  13273 0

c  1+1 --> 2
c    (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0 ∧  p_576) -> (-b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0)
c  in CNF:
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_2
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨  b^{18, 33}_1
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ -p_576 ∨ -b^{18, 33}_0
c  in DIMACS:
 13268  13269 -13270 -576 -13271 0
 13268  13269 -13270 -576  13272 0
 13268  13269 -13270 -576 -13273 0

c  2+1 --> break 
c    (-b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧  p_576) -> break
c  in CNF:
c     b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 13268 -13269  13270 -576 1162 0


c  2-1 --> 1
c    (-b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧ -p_576) -> (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0)
c  in CNF:
c     b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_2
c     b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_1
c     b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨  b^{18, 33}_0
c  in DIMACS:
 13268 -13269  13270  576 -13271 0
 13268 -13269  13270  576 -13272 0
 13268 -13269  13270  576  13273 0

c  1-1 --> 0
c    (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0 ∧ -p_576) -> (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧ -b^{18, 33}_0)
c  in CNF:
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_2
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_1
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_0
c  in DIMACS:
 13268  13269 -13270  576 -13271 0
 13268  13269 -13270  576 -13272 0
 13268  13269 -13270  576 -13273 0

c  0-1 --> -1
c    (-b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧ -p_576) -> ( b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0)
c  in CNF:
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨  b^{18, 33}_2
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_1
c     b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨  b^{18, 33}_0
c  in DIMACS:
 13268  13269  13270  576  13271 0
 13268  13269  13270  576 -13272 0
 13268  13269  13270  576  13273 0

c  -1-1 --> -2
c    ( b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧  b^{18, 32}_0 ∧ -p_576) -> ( b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0)
c  in CNF:
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨  b^{18, 33}_2
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨  b^{18, 33}_1
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨  p_576 ∨ -b^{18, 33}_0
c  in DIMACS:
-13268  13269 -13270  576  13271 0
-13268  13269 -13270  576  13272 0
-13268  13269 -13270  576 -13273 0

c  -2-1 --> break 
c    ( b^{18, 32}_2 ∧  b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨  b^{18, 32}_0 ∨  p_576 ∨ break
c  in DIMACS:
-13268 -13269  13270  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 32}_2 ∧ -b^{18, 32}_1 ∧ -b^{18, 32}_0 ∧ true) 
c  in CNF:
c    -b^{18, 32}_2 ∨  b^{18, 32}_1 ∨  b^{18, 32}_0 ∨ false 
c  in DIMACS:
-13268  13269  13270  0

c  3 does not represent an automaton state.
c    -(-b^{18, 32}_2 ∧  b^{18, 32}_1 ∧  b^{18, 32}_0 ∧ true) 
c  in CNF:
c     b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ false 
c  in DIMACS:
 13268 -13269 -13270  0
c  -3 does not represent an automaton state.
c    -( b^{18, 32}_2 ∧  b^{18, 32}_1 ∧  b^{18, 32}_0 ∧ true) 
c  in CNF:
c    -b^{18, 32}_2 ∨ -b^{18, 32}_1 ∨ -b^{18, 32}_0 ∨ false 
c  in DIMACS:
-13268 -13269 -13270  0

c i = 33
c  -2+1 --> -1
c    ( b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧  p_594) -> ( b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0)
c  in CNF:
c    -b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨  b^{18, 34}_2
c    -b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_1
c    -b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨  b^{18, 34}_0
c  in DIMACS:
-13271 -13272  13273 -594  13274 0
-13271 -13272  13273 -594 -13275 0
-13271 -13272  13273 -594  13276 0

c  -1+1 --> 0
c    ( b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0 ∧  p_594) -> (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧ -b^{18, 34}_0)
c  in CNF:
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_2
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_1
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_0
c  in DIMACS:
-13271  13272 -13273 -594 -13274 0
-13271  13272 -13273 -594 -13275 0
-13271  13272 -13273 -594 -13276 0

c  0+1 --> 1
c    (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧  p_594) -> (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0)
c  in CNF:
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_2
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_1
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨  b^{18, 34}_0
c  in DIMACS:
 13271  13272  13273 -594 -13274 0
 13271  13272  13273 -594 -13275 0
 13271  13272  13273 -594  13276 0

c  1+1 --> 2
c    (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0 ∧  p_594) -> (-b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0)
c  in CNF:
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_2
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨  b^{18, 34}_1
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ -p_594 ∨ -b^{18, 34}_0
c  in DIMACS:
 13271  13272 -13273 -594 -13274 0
 13271  13272 -13273 -594  13275 0
 13271  13272 -13273 -594 -13276 0

c  2+1 --> break 
c    (-b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧  p_594) -> break
c  in CNF:
c     b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 13271 -13272  13273 -594 1162 0


c  2-1 --> 1
c    (-b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧ -p_594) -> (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0)
c  in CNF:
c     b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_2
c     b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_1
c     b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨  b^{18, 34}_0
c  in DIMACS:
 13271 -13272  13273  594 -13274 0
 13271 -13272  13273  594 -13275 0
 13271 -13272  13273  594  13276 0

c  1-1 --> 0
c    (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0 ∧ -p_594) -> (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧ -b^{18, 34}_0)
c  in CNF:
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_2
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_1
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_0
c  in DIMACS:
 13271  13272 -13273  594 -13274 0
 13271  13272 -13273  594 -13275 0
 13271  13272 -13273  594 -13276 0

c  0-1 --> -1
c    (-b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧ -p_594) -> ( b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0)
c  in CNF:
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨  b^{18, 34}_2
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_1
c     b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨  b^{18, 34}_0
c  in DIMACS:
 13271  13272  13273  594  13274 0
 13271  13272  13273  594 -13275 0
 13271  13272  13273  594  13276 0

c  -1-1 --> -2
c    ( b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧  b^{18, 33}_0 ∧ -p_594) -> ( b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0)
c  in CNF:
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨  b^{18, 34}_2
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨  b^{18, 34}_1
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨  p_594 ∨ -b^{18, 34}_0
c  in DIMACS:
-13271  13272 -13273  594  13274 0
-13271  13272 -13273  594  13275 0
-13271  13272 -13273  594 -13276 0

c  -2-1 --> break 
c    ( b^{18, 33}_2 ∧  b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨  b^{18, 33}_0 ∨  p_594 ∨ break
c  in DIMACS:
-13271 -13272  13273  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 33}_2 ∧ -b^{18, 33}_1 ∧ -b^{18, 33}_0 ∧ true) 
c  in CNF:
c    -b^{18, 33}_2 ∨  b^{18, 33}_1 ∨  b^{18, 33}_0 ∨ false 
c  in DIMACS:
-13271  13272  13273  0

c  3 does not represent an automaton state.
c    -(-b^{18, 33}_2 ∧  b^{18, 33}_1 ∧  b^{18, 33}_0 ∧ true) 
c  in CNF:
c     b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ false 
c  in DIMACS:
 13271 -13272 -13273  0
c  -3 does not represent an automaton state.
c    -( b^{18, 33}_2 ∧  b^{18, 33}_1 ∧  b^{18, 33}_0 ∧ true) 
c  in CNF:
c    -b^{18, 33}_2 ∨ -b^{18, 33}_1 ∨ -b^{18, 33}_0 ∨ false 
c  in DIMACS:
-13271 -13272 -13273  0

c i = 34
c  -2+1 --> -1
c    ( b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧  p_612) -> ( b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0)
c  in CNF:
c    -b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨  b^{18, 35}_2
c    -b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_1
c    -b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨  b^{18, 35}_0
c  in DIMACS:
-13274 -13275  13276 -612  13277 0
-13274 -13275  13276 -612 -13278 0
-13274 -13275  13276 -612  13279 0

c  -1+1 --> 0
c    ( b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0 ∧  p_612) -> (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧ -b^{18, 35}_0)
c  in CNF:
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_2
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_1
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_0
c  in DIMACS:
-13274  13275 -13276 -612 -13277 0
-13274  13275 -13276 -612 -13278 0
-13274  13275 -13276 -612 -13279 0

c  0+1 --> 1
c    (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧  p_612) -> (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0)
c  in CNF:
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_2
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_1
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨  b^{18, 35}_0
c  in DIMACS:
 13274  13275  13276 -612 -13277 0
 13274  13275  13276 -612 -13278 0
 13274  13275  13276 -612  13279 0

c  1+1 --> 2
c    (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0 ∧  p_612) -> (-b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0)
c  in CNF:
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_2
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨  b^{18, 35}_1
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ -p_612 ∨ -b^{18, 35}_0
c  in DIMACS:
 13274  13275 -13276 -612 -13277 0
 13274  13275 -13276 -612  13278 0
 13274  13275 -13276 -612 -13279 0

c  2+1 --> break 
c    (-b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧  p_612) -> break
c  in CNF:
c     b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 13274 -13275  13276 -612 1162 0


c  2-1 --> 1
c    (-b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧ -p_612) -> (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0)
c  in CNF:
c     b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_2
c     b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_1
c     b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨  b^{18, 35}_0
c  in DIMACS:
 13274 -13275  13276  612 -13277 0
 13274 -13275  13276  612 -13278 0
 13274 -13275  13276  612  13279 0

c  1-1 --> 0
c    (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0 ∧ -p_612) -> (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧ -b^{18, 35}_0)
c  in CNF:
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_2
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_1
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_0
c  in DIMACS:
 13274  13275 -13276  612 -13277 0
 13274  13275 -13276  612 -13278 0
 13274  13275 -13276  612 -13279 0

c  0-1 --> -1
c    (-b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧ -p_612) -> ( b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0)
c  in CNF:
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨  b^{18, 35}_2
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_1
c     b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨  b^{18, 35}_0
c  in DIMACS:
 13274  13275  13276  612  13277 0
 13274  13275  13276  612 -13278 0
 13274  13275  13276  612  13279 0

c  -1-1 --> -2
c    ( b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧  b^{18, 34}_0 ∧ -p_612) -> ( b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0)
c  in CNF:
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨  b^{18, 35}_2
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨  b^{18, 35}_1
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨  p_612 ∨ -b^{18, 35}_0
c  in DIMACS:
-13274  13275 -13276  612  13277 0
-13274  13275 -13276  612  13278 0
-13274  13275 -13276  612 -13279 0

c  -2-1 --> break 
c    ( b^{18, 34}_2 ∧  b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨  b^{18, 34}_0 ∨  p_612 ∨ break
c  in DIMACS:
-13274 -13275  13276  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 34}_2 ∧ -b^{18, 34}_1 ∧ -b^{18, 34}_0 ∧ true) 
c  in CNF:
c    -b^{18, 34}_2 ∨  b^{18, 34}_1 ∨  b^{18, 34}_0 ∨ false 
c  in DIMACS:
-13274  13275  13276  0

c  3 does not represent an automaton state.
c    -(-b^{18, 34}_2 ∧  b^{18, 34}_1 ∧  b^{18, 34}_0 ∧ true) 
c  in CNF:
c     b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ false 
c  in DIMACS:
 13274 -13275 -13276  0
c  -3 does not represent an automaton state.
c    -( b^{18, 34}_2 ∧  b^{18, 34}_1 ∧  b^{18, 34}_0 ∧ true) 
c  in CNF:
c    -b^{18, 34}_2 ∨ -b^{18, 34}_1 ∨ -b^{18, 34}_0 ∨ false 
c  in DIMACS:
-13274 -13275 -13276  0

c i = 35
c  -2+1 --> -1
c    ( b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧  p_630) -> ( b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0)
c  in CNF:
c    -b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨  b^{18, 36}_2
c    -b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_1
c    -b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨  b^{18, 36}_0
c  in DIMACS:
-13277 -13278  13279 -630  13280 0
-13277 -13278  13279 -630 -13281 0
-13277 -13278  13279 -630  13282 0

c  -1+1 --> 0
c    ( b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0 ∧  p_630) -> (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧ -b^{18, 36}_0)
c  in CNF:
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_2
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_1
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_0
c  in DIMACS:
-13277  13278 -13279 -630 -13280 0
-13277  13278 -13279 -630 -13281 0
-13277  13278 -13279 -630 -13282 0

c  0+1 --> 1
c    (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧  p_630) -> (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0)
c  in CNF:
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_2
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_1
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨  b^{18, 36}_0
c  in DIMACS:
 13277  13278  13279 -630 -13280 0
 13277  13278  13279 -630 -13281 0
 13277  13278  13279 -630  13282 0

c  1+1 --> 2
c    (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0 ∧  p_630) -> (-b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0)
c  in CNF:
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_2
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨  b^{18, 36}_1
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ -p_630 ∨ -b^{18, 36}_0
c  in DIMACS:
 13277  13278 -13279 -630 -13280 0
 13277  13278 -13279 -630  13281 0
 13277  13278 -13279 -630 -13282 0

c  2+1 --> break 
c    (-b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧  p_630) -> break
c  in CNF:
c     b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 13277 -13278  13279 -630 1162 0


c  2-1 --> 1
c    (-b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧ -p_630) -> (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0)
c  in CNF:
c     b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_2
c     b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_1
c     b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨  b^{18, 36}_0
c  in DIMACS:
 13277 -13278  13279  630 -13280 0
 13277 -13278  13279  630 -13281 0
 13277 -13278  13279  630  13282 0

c  1-1 --> 0
c    (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0 ∧ -p_630) -> (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧ -b^{18, 36}_0)
c  in CNF:
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_2
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_1
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_0
c  in DIMACS:
 13277  13278 -13279  630 -13280 0
 13277  13278 -13279  630 -13281 0
 13277  13278 -13279  630 -13282 0

c  0-1 --> -1
c    (-b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧ -p_630) -> ( b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0)
c  in CNF:
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨  b^{18, 36}_2
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_1
c     b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨  b^{18, 36}_0
c  in DIMACS:
 13277  13278  13279  630  13280 0
 13277  13278  13279  630 -13281 0
 13277  13278  13279  630  13282 0

c  -1-1 --> -2
c    ( b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧  b^{18, 35}_0 ∧ -p_630) -> ( b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0)
c  in CNF:
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨  b^{18, 36}_2
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨  b^{18, 36}_1
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨  p_630 ∨ -b^{18, 36}_0
c  in DIMACS:
-13277  13278 -13279  630  13280 0
-13277  13278 -13279  630  13281 0
-13277  13278 -13279  630 -13282 0

c  -2-1 --> break 
c    ( b^{18, 35}_2 ∧  b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨  b^{18, 35}_0 ∨  p_630 ∨ break
c  in DIMACS:
-13277 -13278  13279  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 35}_2 ∧ -b^{18, 35}_1 ∧ -b^{18, 35}_0 ∧ true) 
c  in CNF:
c    -b^{18, 35}_2 ∨  b^{18, 35}_1 ∨  b^{18, 35}_0 ∨ false 
c  in DIMACS:
-13277  13278  13279  0

c  3 does not represent an automaton state.
c    -(-b^{18, 35}_2 ∧  b^{18, 35}_1 ∧  b^{18, 35}_0 ∧ true) 
c  in CNF:
c     b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ false 
c  in DIMACS:
 13277 -13278 -13279  0
c  -3 does not represent an automaton state.
c    -( b^{18, 35}_2 ∧  b^{18, 35}_1 ∧  b^{18, 35}_0 ∧ true) 
c  in CNF:
c    -b^{18, 35}_2 ∨ -b^{18, 35}_1 ∨ -b^{18, 35}_0 ∨ false 
c  in DIMACS:
-13277 -13278 -13279  0

c i = 36
c  -2+1 --> -1
c    ( b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧  p_648) -> ( b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0)
c  in CNF:
c    -b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨  b^{18, 37}_2
c    -b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_1
c    -b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨  b^{18, 37}_0
c  in DIMACS:
-13280 -13281  13282 -648  13283 0
-13280 -13281  13282 -648 -13284 0
-13280 -13281  13282 -648  13285 0

c  -1+1 --> 0
c    ( b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0 ∧  p_648) -> (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧ -b^{18, 37}_0)
c  in CNF:
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_2
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_1
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_0
c  in DIMACS:
-13280  13281 -13282 -648 -13283 0
-13280  13281 -13282 -648 -13284 0
-13280  13281 -13282 -648 -13285 0

c  0+1 --> 1
c    (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧  p_648) -> (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0)
c  in CNF:
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_2
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_1
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨  b^{18, 37}_0
c  in DIMACS:
 13280  13281  13282 -648 -13283 0
 13280  13281  13282 -648 -13284 0
 13280  13281  13282 -648  13285 0

c  1+1 --> 2
c    (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0 ∧  p_648) -> (-b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0)
c  in CNF:
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_2
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨  b^{18, 37}_1
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ -p_648 ∨ -b^{18, 37}_0
c  in DIMACS:
 13280  13281 -13282 -648 -13283 0
 13280  13281 -13282 -648  13284 0
 13280  13281 -13282 -648 -13285 0

c  2+1 --> break 
c    (-b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧  p_648) -> break
c  in CNF:
c     b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 13280 -13281  13282 -648 1162 0


c  2-1 --> 1
c    (-b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧ -p_648) -> (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0)
c  in CNF:
c     b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_2
c     b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_1
c     b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨  b^{18, 37}_0
c  in DIMACS:
 13280 -13281  13282  648 -13283 0
 13280 -13281  13282  648 -13284 0
 13280 -13281  13282  648  13285 0

c  1-1 --> 0
c    (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0 ∧ -p_648) -> (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧ -b^{18, 37}_0)
c  in CNF:
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_2
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_1
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_0
c  in DIMACS:
 13280  13281 -13282  648 -13283 0
 13280  13281 -13282  648 -13284 0
 13280  13281 -13282  648 -13285 0

c  0-1 --> -1
c    (-b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧ -p_648) -> ( b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0)
c  in CNF:
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨  b^{18, 37}_2
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_1
c     b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨  b^{18, 37}_0
c  in DIMACS:
 13280  13281  13282  648  13283 0
 13280  13281  13282  648 -13284 0
 13280  13281  13282  648  13285 0

c  -1-1 --> -2
c    ( b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧  b^{18, 36}_0 ∧ -p_648) -> ( b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0)
c  in CNF:
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨  b^{18, 37}_2
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨  b^{18, 37}_1
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨  p_648 ∨ -b^{18, 37}_0
c  in DIMACS:
-13280  13281 -13282  648  13283 0
-13280  13281 -13282  648  13284 0
-13280  13281 -13282  648 -13285 0

c  -2-1 --> break 
c    ( b^{18, 36}_2 ∧  b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨  b^{18, 36}_0 ∨  p_648 ∨ break
c  in DIMACS:
-13280 -13281  13282  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 36}_2 ∧ -b^{18, 36}_1 ∧ -b^{18, 36}_0 ∧ true) 
c  in CNF:
c    -b^{18, 36}_2 ∨  b^{18, 36}_1 ∨  b^{18, 36}_0 ∨ false 
c  in DIMACS:
-13280  13281  13282  0

c  3 does not represent an automaton state.
c    -(-b^{18, 36}_2 ∧  b^{18, 36}_1 ∧  b^{18, 36}_0 ∧ true) 
c  in CNF:
c     b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ false 
c  in DIMACS:
 13280 -13281 -13282  0
c  -3 does not represent an automaton state.
c    -( b^{18, 36}_2 ∧  b^{18, 36}_1 ∧  b^{18, 36}_0 ∧ true) 
c  in CNF:
c    -b^{18, 36}_2 ∨ -b^{18, 36}_1 ∨ -b^{18, 36}_0 ∨ false 
c  in DIMACS:
-13280 -13281 -13282  0

c i = 37
c  -2+1 --> -1
c    ( b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧  p_666) -> ( b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0)
c  in CNF:
c    -b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨  b^{18, 38}_2
c    -b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_1
c    -b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨  b^{18, 38}_0
c  in DIMACS:
-13283 -13284  13285 -666  13286 0
-13283 -13284  13285 -666 -13287 0
-13283 -13284  13285 -666  13288 0

c  -1+1 --> 0
c    ( b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0 ∧  p_666) -> (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧ -b^{18, 38}_0)
c  in CNF:
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_2
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_1
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_0
c  in DIMACS:
-13283  13284 -13285 -666 -13286 0
-13283  13284 -13285 -666 -13287 0
-13283  13284 -13285 -666 -13288 0

c  0+1 --> 1
c    (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧  p_666) -> (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0)
c  in CNF:
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_2
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_1
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨  b^{18, 38}_0
c  in DIMACS:
 13283  13284  13285 -666 -13286 0
 13283  13284  13285 -666 -13287 0
 13283  13284  13285 -666  13288 0

c  1+1 --> 2
c    (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0 ∧  p_666) -> (-b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0)
c  in CNF:
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_2
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨  b^{18, 38}_1
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ -p_666 ∨ -b^{18, 38}_0
c  in DIMACS:
 13283  13284 -13285 -666 -13286 0
 13283  13284 -13285 -666  13287 0
 13283  13284 -13285 -666 -13288 0

c  2+1 --> break 
c    (-b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧  p_666) -> break
c  in CNF:
c     b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 13283 -13284  13285 -666 1162 0


c  2-1 --> 1
c    (-b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧ -p_666) -> (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0)
c  in CNF:
c     b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_2
c     b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_1
c     b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨  b^{18, 38}_0
c  in DIMACS:
 13283 -13284  13285  666 -13286 0
 13283 -13284  13285  666 -13287 0
 13283 -13284  13285  666  13288 0

c  1-1 --> 0
c    (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0 ∧ -p_666) -> (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧ -b^{18, 38}_0)
c  in CNF:
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_2
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_1
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_0
c  in DIMACS:
 13283  13284 -13285  666 -13286 0
 13283  13284 -13285  666 -13287 0
 13283  13284 -13285  666 -13288 0

c  0-1 --> -1
c    (-b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧ -p_666) -> ( b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0)
c  in CNF:
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨  b^{18, 38}_2
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_1
c     b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨  b^{18, 38}_0
c  in DIMACS:
 13283  13284  13285  666  13286 0
 13283  13284  13285  666 -13287 0
 13283  13284  13285  666  13288 0

c  -1-1 --> -2
c    ( b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧  b^{18, 37}_0 ∧ -p_666) -> ( b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0)
c  in CNF:
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨  b^{18, 38}_2
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨  b^{18, 38}_1
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨  p_666 ∨ -b^{18, 38}_0
c  in DIMACS:
-13283  13284 -13285  666  13286 0
-13283  13284 -13285  666  13287 0
-13283  13284 -13285  666 -13288 0

c  -2-1 --> break 
c    ( b^{18, 37}_2 ∧  b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨  b^{18, 37}_0 ∨  p_666 ∨ break
c  in DIMACS:
-13283 -13284  13285  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 37}_2 ∧ -b^{18, 37}_1 ∧ -b^{18, 37}_0 ∧ true) 
c  in CNF:
c    -b^{18, 37}_2 ∨  b^{18, 37}_1 ∨  b^{18, 37}_0 ∨ false 
c  in DIMACS:
-13283  13284  13285  0

c  3 does not represent an automaton state.
c    -(-b^{18, 37}_2 ∧  b^{18, 37}_1 ∧  b^{18, 37}_0 ∧ true) 
c  in CNF:
c     b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ false 
c  in DIMACS:
 13283 -13284 -13285  0
c  -3 does not represent an automaton state.
c    -( b^{18, 37}_2 ∧  b^{18, 37}_1 ∧  b^{18, 37}_0 ∧ true) 
c  in CNF:
c    -b^{18, 37}_2 ∨ -b^{18, 37}_1 ∨ -b^{18, 37}_0 ∨ false 
c  in DIMACS:
-13283 -13284 -13285  0

c i = 38
c  -2+1 --> -1
c    ( b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧  p_684) -> ( b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0)
c  in CNF:
c    -b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨  b^{18, 39}_2
c    -b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_1
c    -b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨  b^{18, 39}_0
c  in DIMACS:
-13286 -13287  13288 -684  13289 0
-13286 -13287  13288 -684 -13290 0
-13286 -13287  13288 -684  13291 0

c  -1+1 --> 0
c    ( b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0 ∧  p_684) -> (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧ -b^{18, 39}_0)
c  in CNF:
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_2
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_1
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_0
c  in DIMACS:
-13286  13287 -13288 -684 -13289 0
-13286  13287 -13288 -684 -13290 0
-13286  13287 -13288 -684 -13291 0

c  0+1 --> 1
c    (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧  p_684) -> (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0)
c  in CNF:
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_2
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_1
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨  b^{18, 39}_0
c  in DIMACS:
 13286  13287  13288 -684 -13289 0
 13286  13287  13288 -684 -13290 0
 13286  13287  13288 -684  13291 0

c  1+1 --> 2
c    (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0 ∧  p_684) -> (-b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0)
c  in CNF:
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_2
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨  b^{18, 39}_1
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ -p_684 ∨ -b^{18, 39}_0
c  in DIMACS:
 13286  13287 -13288 -684 -13289 0
 13286  13287 -13288 -684  13290 0
 13286  13287 -13288 -684 -13291 0

c  2+1 --> break 
c    (-b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧  p_684) -> break
c  in CNF:
c     b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 13286 -13287  13288 -684 1162 0


c  2-1 --> 1
c    (-b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧ -p_684) -> (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0)
c  in CNF:
c     b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_2
c     b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_1
c     b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨  b^{18, 39}_0
c  in DIMACS:
 13286 -13287  13288  684 -13289 0
 13286 -13287  13288  684 -13290 0
 13286 -13287  13288  684  13291 0

c  1-1 --> 0
c    (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0 ∧ -p_684) -> (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧ -b^{18, 39}_0)
c  in CNF:
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_2
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_1
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_0
c  in DIMACS:
 13286  13287 -13288  684 -13289 0
 13286  13287 -13288  684 -13290 0
 13286  13287 -13288  684 -13291 0

c  0-1 --> -1
c    (-b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧ -p_684) -> ( b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0)
c  in CNF:
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨  b^{18, 39}_2
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_1
c     b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨  b^{18, 39}_0
c  in DIMACS:
 13286  13287  13288  684  13289 0
 13286  13287  13288  684 -13290 0
 13286  13287  13288  684  13291 0

c  -1-1 --> -2
c    ( b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧  b^{18, 38}_0 ∧ -p_684) -> ( b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0)
c  in CNF:
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨  b^{18, 39}_2
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨  b^{18, 39}_1
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨  p_684 ∨ -b^{18, 39}_0
c  in DIMACS:
-13286  13287 -13288  684  13289 0
-13286  13287 -13288  684  13290 0
-13286  13287 -13288  684 -13291 0

c  -2-1 --> break 
c    ( b^{18, 38}_2 ∧  b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨  b^{18, 38}_0 ∨  p_684 ∨ break
c  in DIMACS:
-13286 -13287  13288  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 38}_2 ∧ -b^{18, 38}_1 ∧ -b^{18, 38}_0 ∧ true) 
c  in CNF:
c    -b^{18, 38}_2 ∨  b^{18, 38}_1 ∨  b^{18, 38}_0 ∨ false 
c  in DIMACS:
-13286  13287  13288  0

c  3 does not represent an automaton state.
c    -(-b^{18, 38}_2 ∧  b^{18, 38}_1 ∧  b^{18, 38}_0 ∧ true) 
c  in CNF:
c     b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ false 
c  in DIMACS:
 13286 -13287 -13288  0
c  -3 does not represent an automaton state.
c    -( b^{18, 38}_2 ∧  b^{18, 38}_1 ∧  b^{18, 38}_0 ∧ true) 
c  in CNF:
c    -b^{18, 38}_2 ∨ -b^{18, 38}_1 ∨ -b^{18, 38}_0 ∨ false 
c  in DIMACS:
-13286 -13287 -13288  0

c i = 39
c  -2+1 --> -1
c    ( b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧  p_702) -> ( b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0)
c  in CNF:
c    -b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨  b^{18, 40}_2
c    -b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_1
c    -b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨  b^{18, 40}_0
c  in DIMACS:
-13289 -13290  13291 -702  13292 0
-13289 -13290  13291 -702 -13293 0
-13289 -13290  13291 -702  13294 0

c  -1+1 --> 0
c    ( b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0 ∧  p_702) -> (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧ -b^{18, 40}_0)
c  in CNF:
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_2
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_1
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_0
c  in DIMACS:
-13289  13290 -13291 -702 -13292 0
-13289  13290 -13291 -702 -13293 0
-13289  13290 -13291 -702 -13294 0

c  0+1 --> 1
c    (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧  p_702) -> (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0)
c  in CNF:
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_2
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_1
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨  b^{18, 40}_0
c  in DIMACS:
 13289  13290  13291 -702 -13292 0
 13289  13290  13291 -702 -13293 0
 13289  13290  13291 -702  13294 0

c  1+1 --> 2
c    (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0 ∧  p_702) -> (-b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0)
c  in CNF:
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_2
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨  b^{18, 40}_1
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ -p_702 ∨ -b^{18, 40}_0
c  in DIMACS:
 13289  13290 -13291 -702 -13292 0
 13289  13290 -13291 -702  13293 0
 13289  13290 -13291 -702 -13294 0

c  2+1 --> break 
c    (-b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧  p_702) -> break
c  in CNF:
c     b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 13289 -13290  13291 -702 1162 0


c  2-1 --> 1
c    (-b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧ -p_702) -> (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0)
c  in CNF:
c     b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_2
c     b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_1
c     b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨  b^{18, 40}_0
c  in DIMACS:
 13289 -13290  13291  702 -13292 0
 13289 -13290  13291  702 -13293 0
 13289 -13290  13291  702  13294 0

c  1-1 --> 0
c    (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0 ∧ -p_702) -> (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧ -b^{18, 40}_0)
c  in CNF:
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_2
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_1
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_0
c  in DIMACS:
 13289  13290 -13291  702 -13292 0
 13289  13290 -13291  702 -13293 0
 13289  13290 -13291  702 -13294 0

c  0-1 --> -1
c    (-b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧ -p_702) -> ( b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0)
c  in CNF:
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨  b^{18, 40}_2
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_1
c     b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨  b^{18, 40}_0
c  in DIMACS:
 13289  13290  13291  702  13292 0
 13289  13290  13291  702 -13293 0
 13289  13290  13291  702  13294 0

c  -1-1 --> -2
c    ( b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧  b^{18, 39}_0 ∧ -p_702) -> ( b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0)
c  in CNF:
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨  b^{18, 40}_2
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨  b^{18, 40}_1
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨  p_702 ∨ -b^{18, 40}_0
c  in DIMACS:
-13289  13290 -13291  702  13292 0
-13289  13290 -13291  702  13293 0
-13289  13290 -13291  702 -13294 0

c  -2-1 --> break 
c    ( b^{18, 39}_2 ∧  b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨  b^{18, 39}_0 ∨  p_702 ∨ break
c  in DIMACS:
-13289 -13290  13291  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 39}_2 ∧ -b^{18, 39}_1 ∧ -b^{18, 39}_0 ∧ true) 
c  in CNF:
c    -b^{18, 39}_2 ∨  b^{18, 39}_1 ∨  b^{18, 39}_0 ∨ false 
c  in DIMACS:
-13289  13290  13291  0

c  3 does not represent an automaton state.
c    -(-b^{18, 39}_2 ∧  b^{18, 39}_1 ∧  b^{18, 39}_0 ∧ true) 
c  in CNF:
c     b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ false 
c  in DIMACS:
 13289 -13290 -13291  0
c  -3 does not represent an automaton state.
c    -( b^{18, 39}_2 ∧  b^{18, 39}_1 ∧  b^{18, 39}_0 ∧ true) 
c  in CNF:
c    -b^{18, 39}_2 ∨ -b^{18, 39}_1 ∨ -b^{18, 39}_0 ∨ false 
c  in DIMACS:
-13289 -13290 -13291  0

c i = 40
c  -2+1 --> -1
c    ( b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧  p_720) -> ( b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0)
c  in CNF:
c    -b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨  b^{18, 41}_2
c    -b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_1
c    -b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨  b^{18, 41}_0
c  in DIMACS:
-13292 -13293  13294 -720  13295 0
-13292 -13293  13294 -720 -13296 0
-13292 -13293  13294 -720  13297 0

c  -1+1 --> 0
c    ( b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0 ∧  p_720) -> (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧ -b^{18, 41}_0)
c  in CNF:
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_2
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_1
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_0
c  in DIMACS:
-13292  13293 -13294 -720 -13295 0
-13292  13293 -13294 -720 -13296 0
-13292  13293 -13294 -720 -13297 0

c  0+1 --> 1
c    (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧  p_720) -> (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0)
c  in CNF:
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_2
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_1
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨  b^{18, 41}_0
c  in DIMACS:
 13292  13293  13294 -720 -13295 0
 13292  13293  13294 -720 -13296 0
 13292  13293  13294 -720  13297 0

c  1+1 --> 2
c    (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0 ∧  p_720) -> (-b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0)
c  in CNF:
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_2
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨  b^{18, 41}_1
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ -p_720 ∨ -b^{18, 41}_0
c  in DIMACS:
 13292  13293 -13294 -720 -13295 0
 13292  13293 -13294 -720  13296 0
 13292  13293 -13294 -720 -13297 0

c  2+1 --> break 
c    (-b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧  p_720) -> break
c  in CNF:
c     b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 13292 -13293  13294 -720 1162 0


c  2-1 --> 1
c    (-b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧ -p_720) -> (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0)
c  in CNF:
c     b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_2
c     b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_1
c     b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨  b^{18, 41}_0
c  in DIMACS:
 13292 -13293  13294  720 -13295 0
 13292 -13293  13294  720 -13296 0
 13292 -13293  13294  720  13297 0

c  1-1 --> 0
c    (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0 ∧ -p_720) -> (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧ -b^{18, 41}_0)
c  in CNF:
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_2
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_1
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_0
c  in DIMACS:
 13292  13293 -13294  720 -13295 0
 13292  13293 -13294  720 -13296 0
 13292  13293 -13294  720 -13297 0

c  0-1 --> -1
c    (-b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧ -p_720) -> ( b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0)
c  in CNF:
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨  b^{18, 41}_2
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_1
c     b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨  b^{18, 41}_0
c  in DIMACS:
 13292  13293  13294  720  13295 0
 13292  13293  13294  720 -13296 0
 13292  13293  13294  720  13297 0

c  -1-1 --> -2
c    ( b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧  b^{18, 40}_0 ∧ -p_720) -> ( b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0)
c  in CNF:
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨  b^{18, 41}_2
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨  b^{18, 41}_1
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨  p_720 ∨ -b^{18, 41}_0
c  in DIMACS:
-13292  13293 -13294  720  13295 0
-13292  13293 -13294  720  13296 0
-13292  13293 -13294  720 -13297 0

c  -2-1 --> break 
c    ( b^{18, 40}_2 ∧  b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨  b^{18, 40}_0 ∨  p_720 ∨ break
c  in DIMACS:
-13292 -13293  13294  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 40}_2 ∧ -b^{18, 40}_1 ∧ -b^{18, 40}_0 ∧ true) 
c  in CNF:
c    -b^{18, 40}_2 ∨  b^{18, 40}_1 ∨  b^{18, 40}_0 ∨ false 
c  in DIMACS:
-13292  13293  13294  0

c  3 does not represent an automaton state.
c    -(-b^{18, 40}_2 ∧  b^{18, 40}_1 ∧  b^{18, 40}_0 ∧ true) 
c  in CNF:
c     b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ false 
c  in DIMACS:
 13292 -13293 -13294  0
c  -3 does not represent an automaton state.
c    -( b^{18, 40}_2 ∧  b^{18, 40}_1 ∧  b^{18, 40}_0 ∧ true) 
c  in CNF:
c    -b^{18, 40}_2 ∨ -b^{18, 40}_1 ∨ -b^{18, 40}_0 ∨ false 
c  in DIMACS:
-13292 -13293 -13294  0

c i = 41
c  -2+1 --> -1
c    ( b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧  p_738) -> ( b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0)
c  in CNF:
c    -b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨  b^{18, 42}_2
c    -b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_1
c    -b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨  b^{18, 42}_0
c  in DIMACS:
-13295 -13296  13297 -738  13298 0
-13295 -13296  13297 -738 -13299 0
-13295 -13296  13297 -738  13300 0

c  -1+1 --> 0
c    ( b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0 ∧  p_738) -> (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧ -b^{18, 42}_0)
c  in CNF:
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_2
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_1
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_0
c  in DIMACS:
-13295  13296 -13297 -738 -13298 0
-13295  13296 -13297 -738 -13299 0
-13295  13296 -13297 -738 -13300 0

c  0+1 --> 1
c    (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧  p_738) -> (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0)
c  in CNF:
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_2
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_1
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨  b^{18, 42}_0
c  in DIMACS:
 13295  13296  13297 -738 -13298 0
 13295  13296  13297 -738 -13299 0
 13295  13296  13297 -738  13300 0

c  1+1 --> 2
c    (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0 ∧  p_738) -> (-b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0)
c  in CNF:
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_2
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨  b^{18, 42}_1
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ -p_738 ∨ -b^{18, 42}_0
c  in DIMACS:
 13295  13296 -13297 -738 -13298 0
 13295  13296 -13297 -738  13299 0
 13295  13296 -13297 -738 -13300 0

c  2+1 --> break 
c    (-b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧  p_738) -> break
c  in CNF:
c     b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 13295 -13296  13297 -738 1162 0


c  2-1 --> 1
c    (-b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧ -p_738) -> (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0)
c  in CNF:
c     b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_2
c     b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_1
c     b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨  b^{18, 42}_0
c  in DIMACS:
 13295 -13296  13297  738 -13298 0
 13295 -13296  13297  738 -13299 0
 13295 -13296  13297  738  13300 0

c  1-1 --> 0
c    (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0 ∧ -p_738) -> (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧ -b^{18, 42}_0)
c  in CNF:
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_2
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_1
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_0
c  in DIMACS:
 13295  13296 -13297  738 -13298 0
 13295  13296 -13297  738 -13299 0
 13295  13296 -13297  738 -13300 0

c  0-1 --> -1
c    (-b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧ -p_738) -> ( b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0)
c  in CNF:
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨  b^{18, 42}_2
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_1
c     b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨  b^{18, 42}_0
c  in DIMACS:
 13295  13296  13297  738  13298 0
 13295  13296  13297  738 -13299 0
 13295  13296  13297  738  13300 0

c  -1-1 --> -2
c    ( b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧  b^{18, 41}_0 ∧ -p_738) -> ( b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0)
c  in CNF:
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨  b^{18, 42}_2
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨  b^{18, 42}_1
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨  p_738 ∨ -b^{18, 42}_0
c  in DIMACS:
-13295  13296 -13297  738  13298 0
-13295  13296 -13297  738  13299 0
-13295  13296 -13297  738 -13300 0

c  -2-1 --> break 
c    ( b^{18, 41}_2 ∧  b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨  b^{18, 41}_0 ∨  p_738 ∨ break
c  in DIMACS:
-13295 -13296  13297  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 41}_2 ∧ -b^{18, 41}_1 ∧ -b^{18, 41}_0 ∧ true) 
c  in CNF:
c    -b^{18, 41}_2 ∨  b^{18, 41}_1 ∨  b^{18, 41}_0 ∨ false 
c  in DIMACS:
-13295  13296  13297  0

c  3 does not represent an automaton state.
c    -(-b^{18, 41}_2 ∧  b^{18, 41}_1 ∧  b^{18, 41}_0 ∧ true) 
c  in CNF:
c     b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ false 
c  in DIMACS:
 13295 -13296 -13297  0
c  -3 does not represent an automaton state.
c    -( b^{18, 41}_2 ∧  b^{18, 41}_1 ∧  b^{18, 41}_0 ∧ true) 
c  in CNF:
c    -b^{18, 41}_2 ∨ -b^{18, 41}_1 ∨ -b^{18, 41}_0 ∨ false 
c  in DIMACS:
-13295 -13296 -13297  0

c i = 42
c  -2+1 --> -1
c    ( b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧  p_756) -> ( b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0)
c  in CNF:
c    -b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨  b^{18, 43}_2
c    -b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_1
c    -b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨  b^{18, 43}_0
c  in DIMACS:
-13298 -13299  13300 -756  13301 0
-13298 -13299  13300 -756 -13302 0
-13298 -13299  13300 -756  13303 0

c  -1+1 --> 0
c    ( b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0 ∧  p_756) -> (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧ -b^{18, 43}_0)
c  in CNF:
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_2
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_1
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_0
c  in DIMACS:
-13298  13299 -13300 -756 -13301 0
-13298  13299 -13300 -756 -13302 0
-13298  13299 -13300 -756 -13303 0

c  0+1 --> 1
c    (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧  p_756) -> (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0)
c  in CNF:
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_2
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_1
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨  b^{18, 43}_0
c  in DIMACS:
 13298  13299  13300 -756 -13301 0
 13298  13299  13300 -756 -13302 0
 13298  13299  13300 -756  13303 0

c  1+1 --> 2
c    (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0 ∧  p_756) -> (-b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0)
c  in CNF:
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_2
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨  b^{18, 43}_1
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ -p_756 ∨ -b^{18, 43}_0
c  in DIMACS:
 13298  13299 -13300 -756 -13301 0
 13298  13299 -13300 -756  13302 0
 13298  13299 -13300 -756 -13303 0

c  2+1 --> break 
c    (-b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧  p_756) -> break
c  in CNF:
c     b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 13298 -13299  13300 -756 1162 0


c  2-1 --> 1
c    (-b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧ -p_756) -> (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0)
c  in CNF:
c     b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_2
c     b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_1
c     b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨  b^{18, 43}_0
c  in DIMACS:
 13298 -13299  13300  756 -13301 0
 13298 -13299  13300  756 -13302 0
 13298 -13299  13300  756  13303 0

c  1-1 --> 0
c    (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0 ∧ -p_756) -> (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧ -b^{18, 43}_0)
c  in CNF:
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_2
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_1
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_0
c  in DIMACS:
 13298  13299 -13300  756 -13301 0
 13298  13299 -13300  756 -13302 0
 13298  13299 -13300  756 -13303 0

c  0-1 --> -1
c    (-b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧ -p_756) -> ( b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0)
c  in CNF:
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨  b^{18, 43}_2
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_1
c     b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨  b^{18, 43}_0
c  in DIMACS:
 13298  13299  13300  756  13301 0
 13298  13299  13300  756 -13302 0
 13298  13299  13300  756  13303 0

c  -1-1 --> -2
c    ( b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧  b^{18, 42}_0 ∧ -p_756) -> ( b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0)
c  in CNF:
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨  b^{18, 43}_2
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨  b^{18, 43}_1
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨  p_756 ∨ -b^{18, 43}_0
c  in DIMACS:
-13298  13299 -13300  756  13301 0
-13298  13299 -13300  756  13302 0
-13298  13299 -13300  756 -13303 0

c  -2-1 --> break 
c    ( b^{18, 42}_2 ∧  b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨  b^{18, 42}_0 ∨  p_756 ∨ break
c  in DIMACS:
-13298 -13299  13300  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 42}_2 ∧ -b^{18, 42}_1 ∧ -b^{18, 42}_0 ∧ true) 
c  in CNF:
c    -b^{18, 42}_2 ∨  b^{18, 42}_1 ∨  b^{18, 42}_0 ∨ false 
c  in DIMACS:
-13298  13299  13300  0

c  3 does not represent an automaton state.
c    -(-b^{18, 42}_2 ∧  b^{18, 42}_1 ∧  b^{18, 42}_0 ∧ true) 
c  in CNF:
c     b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ false 
c  in DIMACS:
 13298 -13299 -13300  0
c  -3 does not represent an automaton state.
c    -( b^{18, 42}_2 ∧  b^{18, 42}_1 ∧  b^{18, 42}_0 ∧ true) 
c  in CNF:
c    -b^{18, 42}_2 ∨ -b^{18, 42}_1 ∨ -b^{18, 42}_0 ∨ false 
c  in DIMACS:
-13298 -13299 -13300  0

c i = 43
c  -2+1 --> -1
c    ( b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧  p_774) -> ( b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0)
c  in CNF:
c    -b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨  b^{18, 44}_2
c    -b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_1
c    -b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨  b^{18, 44}_0
c  in DIMACS:
-13301 -13302  13303 -774  13304 0
-13301 -13302  13303 -774 -13305 0
-13301 -13302  13303 -774  13306 0

c  -1+1 --> 0
c    ( b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0 ∧  p_774) -> (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧ -b^{18, 44}_0)
c  in CNF:
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_2
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_1
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_0
c  in DIMACS:
-13301  13302 -13303 -774 -13304 0
-13301  13302 -13303 -774 -13305 0
-13301  13302 -13303 -774 -13306 0

c  0+1 --> 1
c    (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧  p_774) -> (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0)
c  in CNF:
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_2
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_1
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨  b^{18, 44}_0
c  in DIMACS:
 13301  13302  13303 -774 -13304 0
 13301  13302  13303 -774 -13305 0
 13301  13302  13303 -774  13306 0

c  1+1 --> 2
c    (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0 ∧  p_774) -> (-b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0)
c  in CNF:
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_2
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨  b^{18, 44}_1
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ -p_774 ∨ -b^{18, 44}_0
c  in DIMACS:
 13301  13302 -13303 -774 -13304 0
 13301  13302 -13303 -774  13305 0
 13301  13302 -13303 -774 -13306 0

c  2+1 --> break 
c    (-b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧  p_774) -> break
c  in CNF:
c     b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 13301 -13302  13303 -774 1162 0


c  2-1 --> 1
c    (-b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧ -p_774) -> (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0)
c  in CNF:
c     b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_2
c     b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_1
c     b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨  b^{18, 44}_0
c  in DIMACS:
 13301 -13302  13303  774 -13304 0
 13301 -13302  13303  774 -13305 0
 13301 -13302  13303  774  13306 0

c  1-1 --> 0
c    (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0 ∧ -p_774) -> (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧ -b^{18, 44}_0)
c  in CNF:
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_2
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_1
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_0
c  in DIMACS:
 13301  13302 -13303  774 -13304 0
 13301  13302 -13303  774 -13305 0
 13301  13302 -13303  774 -13306 0

c  0-1 --> -1
c    (-b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧ -p_774) -> ( b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0)
c  in CNF:
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨  b^{18, 44}_2
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_1
c     b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨  b^{18, 44}_0
c  in DIMACS:
 13301  13302  13303  774  13304 0
 13301  13302  13303  774 -13305 0
 13301  13302  13303  774  13306 0

c  -1-1 --> -2
c    ( b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧  b^{18, 43}_0 ∧ -p_774) -> ( b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0)
c  in CNF:
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨  b^{18, 44}_2
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨  b^{18, 44}_1
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨  p_774 ∨ -b^{18, 44}_0
c  in DIMACS:
-13301  13302 -13303  774  13304 0
-13301  13302 -13303  774  13305 0
-13301  13302 -13303  774 -13306 0

c  -2-1 --> break 
c    ( b^{18, 43}_2 ∧  b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨  b^{18, 43}_0 ∨  p_774 ∨ break
c  in DIMACS:
-13301 -13302  13303  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 43}_2 ∧ -b^{18, 43}_1 ∧ -b^{18, 43}_0 ∧ true) 
c  in CNF:
c    -b^{18, 43}_2 ∨  b^{18, 43}_1 ∨  b^{18, 43}_0 ∨ false 
c  in DIMACS:
-13301  13302  13303  0

c  3 does not represent an automaton state.
c    -(-b^{18, 43}_2 ∧  b^{18, 43}_1 ∧  b^{18, 43}_0 ∧ true) 
c  in CNF:
c     b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ false 
c  in DIMACS:
 13301 -13302 -13303  0
c  -3 does not represent an automaton state.
c    -( b^{18, 43}_2 ∧  b^{18, 43}_1 ∧  b^{18, 43}_0 ∧ true) 
c  in CNF:
c    -b^{18, 43}_2 ∨ -b^{18, 43}_1 ∨ -b^{18, 43}_0 ∨ false 
c  in DIMACS:
-13301 -13302 -13303  0

c i = 44
c  -2+1 --> -1
c    ( b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧  p_792) -> ( b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0)
c  in CNF:
c    -b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨  b^{18, 45}_2
c    -b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_1
c    -b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨  b^{18, 45}_0
c  in DIMACS:
-13304 -13305  13306 -792  13307 0
-13304 -13305  13306 -792 -13308 0
-13304 -13305  13306 -792  13309 0

c  -1+1 --> 0
c    ( b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0 ∧  p_792) -> (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧ -b^{18, 45}_0)
c  in CNF:
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_2
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_1
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_0
c  in DIMACS:
-13304  13305 -13306 -792 -13307 0
-13304  13305 -13306 -792 -13308 0
-13304  13305 -13306 -792 -13309 0

c  0+1 --> 1
c    (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧  p_792) -> (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0)
c  in CNF:
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_2
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_1
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨  b^{18, 45}_0
c  in DIMACS:
 13304  13305  13306 -792 -13307 0
 13304  13305  13306 -792 -13308 0
 13304  13305  13306 -792  13309 0

c  1+1 --> 2
c    (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0 ∧  p_792) -> (-b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0)
c  in CNF:
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_2
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨  b^{18, 45}_1
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ -p_792 ∨ -b^{18, 45}_0
c  in DIMACS:
 13304  13305 -13306 -792 -13307 0
 13304  13305 -13306 -792  13308 0
 13304  13305 -13306 -792 -13309 0

c  2+1 --> break 
c    (-b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧  p_792) -> break
c  in CNF:
c     b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 13304 -13305  13306 -792 1162 0


c  2-1 --> 1
c    (-b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧ -p_792) -> (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0)
c  in CNF:
c     b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_2
c     b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_1
c     b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨  b^{18, 45}_0
c  in DIMACS:
 13304 -13305  13306  792 -13307 0
 13304 -13305  13306  792 -13308 0
 13304 -13305  13306  792  13309 0

c  1-1 --> 0
c    (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0 ∧ -p_792) -> (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧ -b^{18, 45}_0)
c  in CNF:
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_2
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_1
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_0
c  in DIMACS:
 13304  13305 -13306  792 -13307 0
 13304  13305 -13306  792 -13308 0
 13304  13305 -13306  792 -13309 0

c  0-1 --> -1
c    (-b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧ -p_792) -> ( b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0)
c  in CNF:
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨  b^{18, 45}_2
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_1
c     b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨  b^{18, 45}_0
c  in DIMACS:
 13304  13305  13306  792  13307 0
 13304  13305  13306  792 -13308 0
 13304  13305  13306  792  13309 0

c  -1-1 --> -2
c    ( b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧  b^{18, 44}_0 ∧ -p_792) -> ( b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0)
c  in CNF:
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨  b^{18, 45}_2
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨  b^{18, 45}_1
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨  p_792 ∨ -b^{18, 45}_0
c  in DIMACS:
-13304  13305 -13306  792  13307 0
-13304  13305 -13306  792  13308 0
-13304  13305 -13306  792 -13309 0

c  -2-1 --> break 
c    ( b^{18, 44}_2 ∧  b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨  b^{18, 44}_0 ∨  p_792 ∨ break
c  in DIMACS:
-13304 -13305  13306  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 44}_2 ∧ -b^{18, 44}_1 ∧ -b^{18, 44}_0 ∧ true) 
c  in CNF:
c    -b^{18, 44}_2 ∨  b^{18, 44}_1 ∨  b^{18, 44}_0 ∨ false 
c  in DIMACS:
-13304  13305  13306  0

c  3 does not represent an automaton state.
c    -(-b^{18, 44}_2 ∧  b^{18, 44}_1 ∧  b^{18, 44}_0 ∧ true) 
c  in CNF:
c     b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ false 
c  in DIMACS:
 13304 -13305 -13306  0
c  -3 does not represent an automaton state.
c    -( b^{18, 44}_2 ∧  b^{18, 44}_1 ∧  b^{18, 44}_0 ∧ true) 
c  in CNF:
c    -b^{18, 44}_2 ∨ -b^{18, 44}_1 ∨ -b^{18, 44}_0 ∨ false 
c  in DIMACS:
-13304 -13305 -13306  0

c i = 45
c  -2+1 --> -1
c    ( b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧  p_810) -> ( b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0)
c  in CNF:
c    -b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨  b^{18, 46}_2
c    -b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_1
c    -b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨  b^{18, 46}_0
c  in DIMACS:
-13307 -13308  13309 -810  13310 0
-13307 -13308  13309 -810 -13311 0
-13307 -13308  13309 -810  13312 0

c  -1+1 --> 0
c    ( b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0 ∧  p_810) -> (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧ -b^{18, 46}_0)
c  in CNF:
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_2
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_1
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_0
c  in DIMACS:
-13307  13308 -13309 -810 -13310 0
-13307  13308 -13309 -810 -13311 0
-13307  13308 -13309 -810 -13312 0

c  0+1 --> 1
c    (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧  p_810) -> (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0)
c  in CNF:
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_2
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_1
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨  b^{18, 46}_0
c  in DIMACS:
 13307  13308  13309 -810 -13310 0
 13307  13308  13309 -810 -13311 0
 13307  13308  13309 -810  13312 0

c  1+1 --> 2
c    (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0 ∧  p_810) -> (-b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0)
c  in CNF:
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_2
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨  b^{18, 46}_1
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ -p_810 ∨ -b^{18, 46}_0
c  in DIMACS:
 13307  13308 -13309 -810 -13310 0
 13307  13308 -13309 -810  13311 0
 13307  13308 -13309 -810 -13312 0

c  2+1 --> break 
c    (-b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧  p_810) -> break
c  in CNF:
c     b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 13307 -13308  13309 -810 1162 0


c  2-1 --> 1
c    (-b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧ -p_810) -> (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0)
c  in CNF:
c     b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_2
c     b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_1
c     b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨  b^{18, 46}_0
c  in DIMACS:
 13307 -13308  13309  810 -13310 0
 13307 -13308  13309  810 -13311 0
 13307 -13308  13309  810  13312 0

c  1-1 --> 0
c    (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0 ∧ -p_810) -> (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧ -b^{18, 46}_0)
c  in CNF:
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_2
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_1
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_0
c  in DIMACS:
 13307  13308 -13309  810 -13310 0
 13307  13308 -13309  810 -13311 0
 13307  13308 -13309  810 -13312 0

c  0-1 --> -1
c    (-b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧ -p_810) -> ( b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0)
c  in CNF:
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨  b^{18, 46}_2
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_1
c     b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨  b^{18, 46}_0
c  in DIMACS:
 13307  13308  13309  810  13310 0
 13307  13308  13309  810 -13311 0
 13307  13308  13309  810  13312 0

c  -1-1 --> -2
c    ( b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧  b^{18, 45}_0 ∧ -p_810) -> ( b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0)
c  in CNF:
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨  b^{18, 46}_2
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨  b^{18, 46}_1
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨  p_810 ∨ -b^{18, 46}_0
c  in DIMACS:
-13307  13308 -13309  810  13310 0
-13307  13308 -13309  810  13311 0
-13307  13308 -13309  810 -13312 0

c  -2-1 --> break 
c    ( b^{18, 45}_2 ∧  b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨  b^{18, 45}_0 ∨  p_810 ∨ break
c  in DIMACS:
-13307 -13308  13309  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 45}_2 ∧ -b^{18, 45}_1 ∧ -b^{18, 45}_0 ∧ true) 
c  in CNF:
c    -b^{18, 45}_2 ∨  b^{18, 45}_1 ∨  b^{18, 45}_0 ∨ false 
c  in DIMACS:
-13307  13308  13309  0

c  3 does not represent an automaton state.
c    -(-b^{18, 45}_2 ∧  b^{18, 45}_1 ∧  b^{18, 45}_0 ∧ true) 
c  in CNF:
c     b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ false 
c  in DIMACS:
 13307 -13308 -13309  0
c  -3 does not represent an automaton state.
c    -( b^{18, 45}_2 ∧  b^{18, 45}_1 ∧  b^{18, 45}_0 ∧ true) 
c  in CNF:
c    -b^{18, 45}_2 ∨ -b^{18, 45}_1 ∨ -b^{18, 45}_0 ∨ false 
c  in DIMACS:
-13307 -13308 -13309  0

c i = 46
c  -2+1 --> -1
c    ( b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧  p_828) -> ( b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0)
c  in CNF:
c    -b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨  b^{18, 47}_2
c    -b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_1
c    -b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨  b^{18, 47}_0
c  in DIMACS:
-13310 -13311  13312 -828  13313 0
-13310 -13311  13312 -828 -13314 0
-13310 -13311  13312 -828  13315 0

c  -1+1 --> 0
c    ( b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0 ∧  p_828) -> (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧ -b^{18, 47}_0)
c  in CNF:
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_2
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_1
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_0
c  in DIMACS:
-13310  13311 -13312 -828 -13313 0
-13310  13311 -13312 -828 -13314 0
-13310  13311 -13312 -828 -13315 0

c  0+1 --> 1
c    (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧  p_828) -> (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0)
c  in CNF:
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_2
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_1
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨  b^{18, 47}_0
c  in DIMACS:
 13310  13311  13312 -828 -13313 0
 13310  13311  13312 -828 -13314 0
 13310  13311  13312 -828  13315 0

c  1+1 --> 2
c    (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0 ∧  p_828) -> (-b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0)
c  in CNF:
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_2
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨  b^{18, 47}_1
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ -p_828 ∨ -b^{18, 47}_0
c  in DIMACS:
 13310  13311 -13312 -828 -13313 0
 13310  13311 -13312 -828  13314 0
 13310  13311 -13312 -828 -13315 0

c  2+1 --> break 
c    (-b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧  p_828) -> break
c  in CNF:
c     b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 13310 -13311  13312 -828 1162 0


c  2-1 --> 1
c    (-b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧ -p_828) -> (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0)
c  in CNF:
c     b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_2
c     b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_1
c     b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨  b^{18, 47}_0
c  in DIMACS:
 13310 -13311  13312  828 -13313 0
 13310 -13311  13312  828 -13314 0
 13310 -13311  13312  828  13315 0

c  1-1 --> 0
c    (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0 ∧ -p_828) -> (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧ -b^{18, 47}_0)
c  in CNF:
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_2
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_1
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_0
c  in DIMACS:
 13310  13311 -13312  828 -13313 0
 13310  13311 -13312  828 -13314 0
 13310  13311 -13312  828 -13315 0

c  0-1 --> -1
c    (-b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧ -p_828) -> ( b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0)
c  in CNF:
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨  b^{18, 47}_2
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_1
c     b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨  b^{18, 47}_0
c  in DIMACS:
 13310  13311  13312  828  13313 0
 13310  13311  13312  828 -13314 0
 13310  13311  13312  828  13315 0

c  -1-1 --> -2
c    ( b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧  b^{18, 46}_0 ∧ -p_828) -> ( b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0)
c  in CNF:
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨  b^{18, 47}_2
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨  b^{18, 47}_1
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨  p_828 ∨ -b^{18, 47}_0
c  in DIMACS:
-13310  13311 -13312  828  13313 0
-13310  13311 -13312  828  13314 0
-13310  13311 -13312  828 -13315 0

c  -2-1 --> break 
c    ( b^{18, 46}_2 ∧  b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨  b^{18, 46}_0 ∨  p_828 ∨ break
c  in DIMACS:
-13310 -13311  13312  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 46}_2 ∧ -b^{18, 46}_1 ∧ -b^{18, 46}_0 ∧ true) 
c  in CNF:
c    -b^{18, 46}_2 ∨  b^{18, 46}_1 ∨  b^{18, 46}_0 ∨ false 
c  in DIMACS:
-13310  13311  13312  0

c  3 does not represent an automaton state.
c    -(-b^{18, 46}_2 ∧  b^{18, 46}_1 ∧  b^{18, 46}_0 ∧ true) 
c  in CNF:
c     b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ false 
c  in DIMACS:
 13310 -13311 -13312  0
c  -3 does not represent an automaton state.
c    -( b^{18, 46}_2 ∧  b^{18, 46}_1 ∧  b^{18, 46}_0 ∧ true) 
c  in CNF:
c    -b^{18, 46}_2 ∨ -b^{18, 46}_1 ∨ -b^{18, 46}_0 ∨ false 
c  in DIMACS:
-13310 -13311 -13312  0

c i = 47
c  -2+1 --> -1
c    ( b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧  p_846) -> ( b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0)
c  in CNF:
c    -b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨  b^{18, 48}_2
c    -b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_1
c    -b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨  b^{18, 48}_0
c  in DIMACS:
-13313 -13314  13315 -846  13316 0
-13313 -13314  13315 -846 -13317 0
-13313 -13314  13315 -846  13318 0

c  -1+1 --> 0
c    ( b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0 ∧  p_846) -> (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧ -b^{18, 48}_0)
c  in CNF:
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_2
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_1
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_0
c  in DIMACS:
-13313  13314 -13315 -846 -13316 0
-13313  13314 -13315 -846 -13317 0
-13313  13314 -13315 -846 -13318 0

c  0+1 --> 1
c    (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧  p_846) -> (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0)
c  in CNF:
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_2
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_1
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨  b^{18, 48}_0
c  in DIMACS:
 13313  13314  13315 -846 -13316 0
 13313  13314  13315 -846 -13317 0
 13313  13314  13315 -846  13318 0

c  1+1 --> 2
c    (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0 ∧  p_846) -> (-b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0)
c  in CNF:
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_2
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨  b^{18, 48}_1
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ -p_846 ∨ -b^{18, 48}_0
c  in DIMACS:
 13313  13314 -13315 -846 -13316 0
 13313  13314 -13315 -846  13317 0
 13313  13314 -13315 -846 -13318 0

c  2+1 --> break 
c    (-b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧  p_846) -> break
c  in CNF:
c     b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 13313 -13314  13315 -846 1162 0


c  2-1 --> 1
c    (-b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧ -p_846) -> (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0)
c  in CNF:
c     b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_2
c     b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_1
c     b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨  b^{18, 48}_0
c  in DIMACS:
 13313 -13314  13315  846 -13316 0
 13313 -13314  13315  846 -13317 0
 13313 -13314  13315  846  13318 0

c  1-1 --> 0
c    (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0 ∧ -p_846) -> (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧ -b^{18, 48}_0)
c  in CNF:
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_2
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_1
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_0
c  in DIMACS:
 13313  13314 -13315  846 -13316 0
 13313  13314 -13315  846 -13317 0
 13313  13314 -13315  846 -13318 0

c  0-1 --> -1
c    (-b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧ -p_846) -> ( b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0)
c  in CNF:
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨  b^{18, 48}_2
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_1
c     b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨  b^{18, 48}_0
c  in DIMACS:
 13313  13314  13315  846  13316 0
 13313  13314  13315  846 -13317 0
 13313  13314  13315  846  13318 0

c  -1-1 --> -2
c    ( b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧  b^{18, 47}_0 ∧ -p_846) -> ( b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0)
c  in CNF:
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨  b^{18, 48}_2
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨  b^{18, 48}_1
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨  p_846 ∨ -b^{18, 48}_0
c  in DIMACS:
-13313  13314 -13315  846  13316 0
-13313  13314 -13315  846  13317 0
-13313  13314 -13315  846 -13318 0

c  -2-1 --> break 
c    ( b^{18, 47}_2 ∧  b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨  b^{18, 47}_0 ∨  p_846 ∨ break
c  in DIMACS:
-13313 -13314  13315  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 47}_2 ∧ -b^{18, 47}_1 ∧ -b^{18, 47}_0 ∧ true) 
c  in CNF:
c    -b^{18, 47}_2 ∨  b^{18, 47}_1 ∨  b^{18, 47}_0 ∨ false 
c  in DIMACS:
-13313  13314  13315  0

c  3 does not represent an automaton state.
c    -(-b^{18, 47}_2 ∧  b^{18, 47}_1 ∧  b^{18, 47}_0 ∧ true) 
c  in CNF:
c     b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ false 
c  in DIMACS:
 13313 -13314 -13315  0
c  -3 does not represent an automaton state.
c    -( b^{18, 47}_2 ∧  b^{18, 47}_1 ∧  b^{18, 47}_0 ∧ true) 
c  in CNF:
c    -b^{18, 47}_2 ∨ -b^{18, 47}_1 ∨ -b^{18, 47}_0 ∨ false 
c  in DIMACS:
-13313 -13314 -13315  0

c i = 48
c  -2+1 --> -1
c    ( b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧  p_864) -> ( b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0)
c  in CNF:
c    -b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨  b^{18, 49}_2
c    -b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_1
c    -b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨  b^{18, 49}_0
c  in DIMACS:
-13316 -13317  13318 -864  13319 0
-13316 -13317  13318 -864 -13320 0
-13316 -13317  13318 -864  13321 0

c  -1+1 --> 0
c    ( b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0 ∧  p_864) -> (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧ -b^{18, 49}_0)
c  in CNF:
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_2
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_1
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_0
c  in DIMACS:
-13316  13317 -13318 -864 -13319 0
-13316  13317 -13318 -864 -13320 0
-13316  13317 -13318 -864 -13321 0

c  0+1 --> 1
c    (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧  p_864) -> (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0)
c  in CNF:
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_2
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_1
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨  b^{18, 49}_0
c  in DIMACS:
 13316  13317  13318 -864 -13319 0
 13316  13317  13318 -864 -13320 0
 13316  13317  13318 -864  13321 0

c  1+1 --> 2
c    (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0 ∧  p_864) -> (-b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0)
c  in CNF:
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_2
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨  b^{18, 49}_1
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ -p_864 ∨ -b^{18, 49}_0
c  in DIMACS:
 13316  13317 -13318 -864 -13319 0
 13316  13317 -13318 -864  13320 0
 13316  13317 -13318 -864 -13321 0

c  2+1 --> break 
c    (-b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧  p_864) -> break
c  in CNF:
c     b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 13316 -13317  13318 -864 1162 0


c  2-1 --> 1
c    (-b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧ -p_864) -> (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0)
c  in CNF:
c     b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_2
c     b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_1
c     b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨  b^{18, 49}_0
c  in DIMACS:
 13316 -13317  13318  864 -13319 0
 13316 -13317  13318  864 -13320 0
 13316 -13317  13318  864  13321 0

c  1-1 --> 0
c    (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0 ∧ -p_864) -> (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧ -b^{18, 49}_0)
c  in CNF:
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_2
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_1
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_0
c  in DIMACS:
 13316  13317 -13318  864 -13319 0
 13316  13317 -13318  864 -13320 0
 13316  13317 -13318  864 -13321 0

c  0-1 --> -1
c    (-b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧ -p_864) -> ( b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0)
c  in CNF:
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨  b^{18, 49}_2
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_1
c     b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨  b^{18, 49}_0
c  in DIMACS:
 13316  13317  13318  864  13319 0
 13316  13317  13318  864 -13320 0
 13316  13317  13318  864  13321 0

c  -1-1 --> -2
c    ( b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧  b^{18, 48}_0 ∧ -p_864) -> ( b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0)
c  in CNF:
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨  b^{18, 49}_2
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨  b^{18, 49}_1
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨  p_864 ∨ -b^{18, 49}_0
c  in DIMACS:
-13316  13317 -13318  864  13319 0
-13316  13317 -13318  864  13320 0
-13316  13317 -13318  864 -13321 0

c  -2-1 --> break 
c    ( b^{18, 48}_2 ∧  b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨  b^{18, 48}_0 ∨  p_864 ∨ break
c  in DIMACS:
-13316 -13317  13318  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 48}_2 ∧ -b^{18, 48}_1 ∧ -b^{18, 48}_0 ∧ true) 
c  in CNF:
c    -b^{18, 48}_2 ∨  b^{18, 48}_1 ∨  b^{18, 48}_0 ∨ false 
c  in DIMACS:
-13316  13317  13318  0

c  3 does not represent an automaton state.
c    -(-b^{18, 48}_2 ∧  b^{18, 48}_1 ∧  b^{18, 48}_0 ∧ true) 
c  in CNF:
c     b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ false 
c  in DIMACS:
 13316 -13317 -13318  0
c  -3 does not represent an automaton state.
c    -( b^{18, 48}_2 ∧  b^{18, 48}_1 ∧  b^{18, 48}_0 ∧ true) 
c  in CNF:
c    -b^{18, 48}_2 ∨ -b^{18, 48}_1 ∨ -b^{18, 48}_0 ∨ false 
c  in DIMACS:
-13316 -13317 -13318  0

c i = 49
c  -2+1 --> -1
c    ( b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧  p_882) -> ( b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0)
c  in CNF:
c    -b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨  b^{18, 50}_2
c    -b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_1
c    -b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨  b^{18, 50}_0
c  in DIMACS:
-13319 -13320  13321 -882  13322 0
-13319 -13320  13321 -882 -13323 0
-13319 -13320  13321 -882  13324 0

c  -1+1 --> 0
c    ( b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0 ∧  p_882) -> (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧ -b^{18, 50}_0)
c  in CNF:
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_2
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_1
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_0
c  in DIMACS:
-13319  13320 -13321 -882 -13322 0
-13319  13320 -13321 -882 -13323 0
-13319  13320 -13321 -882 -13324 0

c  0+1 --> 1
c    (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧  p_882) -> (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0)
c  in CNF:
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_2
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_1
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨  b^{18, 50}_0
c  in DIMACS:
 13319  13320  13321 -882 -13322 0
 13319  13320  13321 -882 -13323 0
 13319  13320  13321 -882  13324 0

c  1+1 --> 2
c    (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0 ∧  p_882) -> (-b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0)
c  in CNF:
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_2
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨  b^{18, 50}_1
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ -p_882 ∨ -b^{18, 50}_0
c  in DIMACS:
 13319  13320 -13321 -882 -13322 0
 13319  13320 -13321 -882  13323 0
 13319  13320 -13321 -882 -13324 0

c  2+1 --> break 
c    (-b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧  p_882) -> break
c  in CNF:
c     b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 13319 -13320  13321 -882 1162 0


c  2-1 --> 1
c    (-b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧ -p_882) -> (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0)
c  in CNF:
c     b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_2
c     b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_1
c     b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨  b^{18, 50}_0
c  in DIMACS:
 13319 -13320  13321  882 -13322 0
 13319 -13320  13321  882 -13323 0
 13319 -13320  13321  882  13324 0

c  1-1 --> 0
c    (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0 ∧ -p_882) -> (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧ -b^{18, 50}_0)
c  in CNF:
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_2
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_1
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_0
c  in DIMACS:
 13319  13320 -13321  882 -13322 0
 13319  13320 -13321  882 -13323 0
 13319  13320 -13321  882 -13324 0

c  0-1 --> -1
c    (-b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧ -p_882) -> ( b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0)
c  in CNF:
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨  b^{18, 50}_2
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_1
c     b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨  b^{18, 50}_0
c  in DIMACS:
 13319  13320  13321  882  13322 0
 13319  13320  13321  882 -13323 0
 13319  13320  13321  882  13324 0

c  -1-1 --> -2
c    ( b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧  b^{18, 49}_0 ∧ -p_882) -> ( b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0)
c  in CNF:
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨  b^{18, 50}_2
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨  b^{18, 50}_1
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨  p_882 ∨ -b^{18, 50}_0
c  in DIMACS:
-13319  13320 -13321  882  13322 0
-13319  13320 -13321  882  13323 0
-13319  13320 -13321  882 -13324 0

c  -2-1 --> break 
c    ( b^{18, 49}_2 ∧  b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨  b^{18, 49}_0 ∨  p_882 ∨ break
c  in DIMACS:
-13319 -13320  13321  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 49}_2 ∧ -b^{18, 49}_1 ∧ -b^{18, 49}_0 ∧ true) 
c  in CNF:
c    -b^{18, 49}_2 ∨  b^{18, 49}_1 ∨  b^{18, 49}_0 ∨ false 
c  in DIMACS:
-13319  13320  13321  0

c  3 does not represent an automaton state.
c    -(-b^{18, 49}_2 ∧  b^{18, 49}_1 ∧  b^{18, 49}_0 ∧ true) 
c  in CNF:
c     b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ false 
c  in DIMACS:
 13319 -13320 -13321  0
c  -3 does not represent an automaton state.
c    -( b^{18, 49}_2 ∧  b^{18, 49}_1 ∧  b^{18, 49}_0 ∧ true) 
c  in CNF:
c    -b^{18, 49}_2 ∨ -b^{18, 49}_1 ∨ -b^{18, 49}_0 ∨ false 
c  in DIMACS:
-13319 -13320 -13321  0

c i = 50
c  -2+1 --> -1
c    ( b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧  p_900) -> ( b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0)
c  in CNF:
c    -b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨  b^{18, 51}_2
c    -b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_1
c    -b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨  b^{18, 51}_0
c  in DIMACS:
-13322 -13323  13324 -900  13325 0
-13322 -13323  13324 -900 -13326 0
-13322 -13323  13324 -900  13327 0

c  -1+1 --> 0
c    ( b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0 ∧  p_900) -> (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧ -b^{18, 51}_0)
c  in CNF:
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_2
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_1
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_0
c  in DIMACS:
-13322  13323 -13324 -900 -13325 0
-13322  13323 -13324 -900 -13326 0
-13322  13323 -13324 -900 -13327 0

c  0+1 --> 1
c    (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧  p_900) -> (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0)
c  in CNF:
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_2
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_1
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨  b^{18, 51}_0
c  in DIMACS:
 13322  13323  13324 -900 -13325 0
 13322  13323  13324 -900 -13326 0
 13322  13323  13324 -900  13327 0

c  1+1 --> 2
c    (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0 ∧  p_900) -> (-b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0)
c  in CNF:
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_2
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨  b^{18, 51}_1
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ -p_900 ∨ -b^{18, 51}_0
c  in DIMACS:
 13322  13323 -13324 -900 -13325 0
 13322  13323 -13324 -900  13326 0
 13322  13323 -13324 -900 -13327 0

c  2+1 --> break 
c    (-b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧  p_900) -> break
c  in CNF:
c     b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 13322 -13323  13324 -900 1162 0


c  2-1 --> 1
c    (-b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧ -p_900) -> (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0)
c  in CNF:
c     b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_2
c     b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_1
c     b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨  b^{18, 51}_0
c  in DIMACS:
 13322 -13323  13324  900 -13325 0
 13322 -13323  13324  900 -13326 0
 13322 -13323  13324  900  13327 0

c  1-1 --> 0
c    (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0 ∧ -p_900) -> (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧ -b^{18, 51}_0)
c  in CNF:
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_2
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_1
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_0
c  in DIMACS:
 13322  13323 -13324  900 -13325 0
 13322  13323 -13324  900 -13326 0
 13322  13323 -13324  900 -13327 0

c  0-1 --> -1
c    (-b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧ -p_900) -> ( b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0)
c  in CNF:
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨  b^{18, 51}_2
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_1
c     b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨  b^{18, 51}_0
c  in DIMACS:
 13322  13323  13324  900  13325 0
 13322  13323  13324  900 -13326 0
 13322  13323  13324  900  13327 0

c  -1-1 --> -2
c    ( b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧  b^{18, 50}_0 ∧ -p_900) -> ( b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0)
c  in CNF:
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨  b^{18, 51}_2
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨  b^{18, 51}_1
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨  p_900 ∨ -b^{18, 51}_0
c  in DIMACS:
-13322  13323 -13324  900  13325 0
-13322  13323 -13324  900  13326 0
-13322  13323 -13324  900 -13327 0

c  -2-1 --> break 
c    ( b^{18, 50}_2 ∧  b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨  b^{18, 50}_0 ∨  p_900 ∨ break
c  in DIMACS:
-13322 -13323  13324  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 50}_2 ∧ -b^{18, 50}_1 ∧ -b^{18, 50}_0 ∧ true) 
c  in CNF:
c    -b^{18, 50}_2 ∨  b^{18, 50}_1 ∨  b^{18, 50}_0 ∨ false 
c  in DIMACS:
-13322  13323  13324  0

c  3 does not represent an automaton state.
c    -(-b^{18, 50}_2 ∧  b^{18, 50}_1 ∧  b^{18, 50}_0 ∧ true) 
c  in CNF:
c     b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ false 
c  in DIMACS:
 13322 -13323 -13324  0
c  -3 does not represent an automaton state.
c    -( b^{18, 50}_2 ∧  b^{18, 50}_1 ∧  b^{18, 50}_0 ∧ true) 
c  in CNF:
c    -b^{18, 50}_2 ∨ -b^{18, 50}_1 ∨ -b^{18, 50}_0 ∨ false 
c  in DIMACS:
-13322 -13323 -13324  0

c i = 51
c  -2+1 --> -1
c    ( b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧  p_918) -> ( b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0)
c  in CNF:
c    -b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨  b^{18, 52}_2
c    -b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_1
c    -b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨  b^{18, 52}_0
c  in DIMACS:
-13325 -13326  13327 -918  13328 0
-13325 -13326  13327 -918 -13329 0
-13325 -13326  13327 -918  13330 0

c  -1+1 --> 0
c    ( b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0 ∧  p_918) -> (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧ -b^{18, 52}_0)
c  in CNF:
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_2
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_1
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_0
c  in DIMACS:
-13325  13326 -13327 -918 -13328 0
-13325  13326 -13327 -918 -13329 0
-13325  13326 -13327 -918 -13330 0

c  0+1 --> 1
c    (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧  p_918) -> (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0)
c  in CNF:
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_2
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_1
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨  b^{18, 52}_0
c  in DIMACS:
 13325  13326  13327 -918 -13328 0
 13325  13326  13327 -918 -13329 0
 13325  13326  13327 -918  13330 0

c  1+1 --> 2
c    (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0 ∧  p_918) -> (-b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0)
c  in CNF:
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_2
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨  b^{18, 52}_1
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ -p_918 ∨ -b^{18, 52}_0
c  in DIMACS:
 13325  13326 -13327 -918 -13328 0
 13325  13326 -13327 -918  13329 0
 13325  13326 -13327 -918 -13330 0

c  2+1 --> break 
c    (-b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧  p_918) -> break
c  in CNF:
c     b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 13325 -13326  13327 -918 1162 0


c  2-1 --> 1
c    (-b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧ -p_918) -> (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0)
c  in CNF:
c     b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_2
c     b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_1
c     b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨  b^{18, 52}_0
c  in DIMACS:
 13325 -13326  13327  918 -13328 0
 13325 -13326  13327  918 -13329 0
 13325 -13326  13327  918  13330 0

c  1-1 --> 0
c    (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0 ∧ -p_918) -> (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧ -b^{18, 52}_0)
c  in CNF:
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_2
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_1
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_0
c  in DIMACS:
 13325  13326 -13327  918 -13328 0
 13325  13326 -13327  918 -13329 0
 13325  13326 -13327  918 -13330 0

c  0-1 --> -1
c    (-b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧ -p_918) -> ( b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0)
c  in CNF:
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨  b^{18, 52}_2
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_1
c     b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨  b^{18, 52}_0
c  in DIMACS:
 13325  13326  13327  918  13328 0
 13325  13326  13327  918 -13329 0
 13325  13326  13327  918  13330 0

c  -1-1 --> -2
c    ( b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧  b^{18, 51}_0 ∧ -p_918) -> ( b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0)
c  in CNF:
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨  b^{18, 52}_2
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨  b^{18, 52}_1
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨  p_918 ∨ -b^{18, 52}_0
c  in DIMACS:
-13325  13326 -13327  918  13328 0
-13325  13326 -13327  918  13329 0
-13325  13326 -13327  918 -13330 0

c  -2-1 --> break 
c    ( b^{18, 51}_2 ∧  b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨  b^{18, 51}_0 ∨  p_918 ∨ break
c  in DIMACS:
-13325 -13326  13327  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 51}_2 ∧ -b^{18, 51}_1 ∧ -b^{18, 51}_0 ∧ true) 
c  in CNF:
c    -b^{18, 51}_2 ∨  b^{18, 51}_1 ∨  b^{18, 51}_0 ∨ false 
c  in DIMACS:
-13325  13326  13327  0

c  3 does not represent an automaton state.
c    -(-b^{18, 51}_2 ∧  b^{18, 51}_1 ∧  b^{18, 51}_0 ∧ true) 
c  in CNF:
c     b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ false 
c  in DIMACS:
 13325 -13326 -13327  0
c  -3 does not represent an automaton state.
c    -( b^{18, 51}_2 ∧  b^{18, 51}_1 ∧  b^{18, 51}_0 ∧ true) 
c  in CNF:
c    -b^{18, 51}_2 ∨ -b^{18, 51}_1 ∨ -b^{18, 51}_0 ∨ false 
c  in DIMACS:
-13325 -13326 -13327  0

c i = 52
c  -2+1 --> -1
c    ( b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧  p_936) -> ( b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0)
c  in CNF:
c    -b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨  b^{18, 53}_2
c    -b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_1
c    -b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨  b^{18, 53}_0
c  in DIMACS:
-13328 -13329  13330 -936  13331 0
-13328 -13329  13330 -936 -13332 0
-13328 -13329  13330 -936  13333 0

c  -1+1 --> 0
c    ( b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0 ∧  p_936) -> (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧ -b^{18, 53}_0)
c  in CNF:
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_2
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_1
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_0
c  in DIMACS:
-13328  13329 -13330 -936 -13331 0
-13328  13329 -13330 -936 -13332 0
-13328  13329 -13330 -936 -13333 0

c  0+1 --> 1
c    (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧  p_936) -> (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0)
c  in CNF:
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_2
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_1
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨  b^{18, 53}_0
c  in DIMACS:
 13328  13329  13330 -936 -13331 0
 13328  13329  13330 -936 -13332 0
 13328  13329  13330 -936  13333 0

c  1+1 --> 2
c    (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0 ∧  p_936) -> (-b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0)
c  in CNF:
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_2
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨  b^{18, 53}_1
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ -p_936 ∨ -b^{18, 53}_0
c  in DIMACS:
 13328  13329 -13330 -936 -13331 0
 13328  13329 -13330 -936  13332 0
 13328  13329 -13330 -936 -13333 0

c  2+1 --> break 
c    (-b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧  p_936) -> break
c  in CNF:
c     b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 13328 -13329  13330 -936 1162 0


c  2-1 --> 1
c    (-b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧ -p_936) -> (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0)
c  in CNF:
c     b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_2
c     b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_1
c     b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨  b^{18, 53}_0
c  in DIMACS:
 13328 -13329  13330  936 -13331 0
 13328 -13329  13330  936 -13332 0
 13328 -13329  13330  936  13333 0

c  1-1 --> 0
c    (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0 ∧ -p_936) -> (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧ -b^{18, 53}_0)
c  in CNF:
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_2
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_1
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_0
c  in DIMACS:
 13328  13329 -13330  936 -13331 0
 13328  13329 -13330  936 -13332 0
 13328  13329 -13330  936 -13333 0

c  0-1 --> -1
c    (-b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧ -p_936) -> ( b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0)
c  in CNF:
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨  b^{18, 53}_2
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_1
c     b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨  b^{18, 53}_0
c  in DIMACS:
 13328  13329  13330  936  13331 0
 13328  13329  13330  936 -13332 0
 13328  13329  13330  936  13333 0

c  -1-1 --> -2
c    ( b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧  b^{18, 52}_0 ∧ -p_936) -> ( b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0)
c  in CNF:
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨  b^{18, 53}_2
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨  b^{18, 53}_1
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨  p_936 ∨ -b^{18, 53}_0
c  in DIMACS:
-13328  13329 -13330  936  13331 0
-13328  13329 -13330  936  13332 0
-13328  13329 -13330  936 -13333 0

c  -2-1 --> break 
c    ( b^{18, 52}_2 ∧  b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨  b^{18, 52}_0 ∨  p_936 ∨ break
c  in DIMACS:
-13328 -13329  13330  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 52}_2 ∧ -b^{18, 52}_1 ∧ -b^{18, 52}_0 ∧ true) 
c  in CNF:
c    -b^{18, 52}_2 ∨  b^{18, 52}_1 ∨  b^{18, 52}_0 ∨ false 
c  in DIMACS:
-13328  13329  13330  0

c  3 does not represent an automaton state.
c    -(-b^{18, 52}_2 ∧  b^{18, 52}_1 ∧  b^{18, 52}_0 ∧ true) 
c  in CNF:
c     b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ false 
c  in DIMACS:
 13328 -13329 -13330  0
c  -3 does not represent an automaton state.
c    -( b^{18, 52}_2 ∧  b^{18, 52}_1 ∧  b^{18, 52}_0 ∧ true) 
c  in CNF:
c    -b^{18, 52}_2 ∨ -b^{18, 52}_1 ∨ -b^{18, 52}_0 ∨ false 
c  in DIMACS:
-13328 -13329 -13330  0

c i = 53
c  -2+1 --> -1
c    ( b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧  p_954) -> ( b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0)
c  in CNF:
c    -b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨  b^{18, 54}_2
c    -b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_1
c    -b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨  b^{18, 54}_0
c  in DIMACS:
-13331 -13332  13333 -954  13334 0
-13331 -13332  13333 -954 -13335 0
-13331 -13332  13333 -954  13336 0

c  -1+1 --> 0
c    ( b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0 ∧  p_954) -> (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧ -b^{18, 54}_0)
c  in CNF:
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_2
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_1
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_0
c  in DIMACS:
-13331  13332 -13333 -954 -13334 0
-13331  13332 -13333 -954 -13335 0
-13331  13332 -13333 -954 -13336 0

c  0+1 --> 1
c    (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧  p_954) -> (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0)
c  in CNF:
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_2
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_1
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨  b^{18, 54}_0
c  in DIMACS:
 13331  13332  13333 -954 -13334 0
 13331  13332  13333 -954 -13335 0
 13331  13332  13333 -954  13336 0

c  1+1 --> 2
c    (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0 ∧  p_954) -> (-b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0)
c  in CNF:
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_2
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨  b^{18, 54}_1
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ -p_954 ∨ -b^{18, 54}_0
c  in DIMACS:
 13331  13332 -13333 -954 -13334 0
 13331  13332 -13333 -954  13335 0
 13331  13332 -13333 -954 -13336 0

c  2+1 --> break 
c    (-b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧  p_954) -> break
c  in CNF:
c     b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 13331 -13332  13333 -954 1162 0


c  2-1 --> 1
c    (-b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧ -p_954) -> (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0)
c  in CNF:
c     b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_2
c     b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_1
c     b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨  b^{18, 54}_0
c  in DIMACS:
 13331 -13332  13333  954 -13334 0
 13331 -13332  13333  954 -13335 0
 13331 -13332  13333  954  13336 0

c  1-1 --> 0
c    (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0 ∧ -p_954) -> (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧ -b^{18, 54}_0)
c  in CNF:
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_2
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_1
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_0
c  in DIMACS:
 13331  13332 -13333  954 -13334 0
 13331  13332 -13333  954 -13335 0
 13331  13332 -13333  954 -13336 0

c  0-1 --> -1
c    (-b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧ -p_954) -> ( b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0)
c  in CNF:
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨  b^{18, 54}_2
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_1
c     b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨  b^{18, 54}_0
c  in DIMACS:
 13331  13332  13333  954  13334 0
 13331  13332  13333  954 -13335 0
 13331  13332  13333  954  13336 0

c  -1-1 --> -2
c    ( b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧  b^{18, 53}_0 ∧ -p_954) -> ( b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0)
c  in CNF:
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨  b^{18, 54}_2
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨  b^{18, 54}_1
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨  p_954 ∨ -b^{18, 54}_0
c  in DIMACS:
-13331  13332 -13333  954  13334 0
-13331  13332 -13333  954  13335 0
-13331  13332 -13333  954 -13336 0

c  -2-1 --> break 
c    ( b^{18, 53}_2 ∧  b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨  b^{18, 53}_0 ∨  p_954 ∨ break
c  in DIMACS:
-13331 -13332  13333  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 53}_2 ∧ -b^{18, 53}_1 ∧ -b^{18, 53}_0 ∧ true) 
c  in CNF:
c    -b^{18, 53}_2 ∨  b^{18, 53}_1 ∨  b^{18, 53}_0 ∨ false 
c  in DIMACS:
-13331  13332  13333  0

c  3 does not represent an automaton state.
c    -(-b^{18, 53}_2 ∧  b^{18, 53}_1 ∧  b^{18, 53}_0 ∧ true) 
c  in CNF:
c     b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ false 
c  in DIMACS:
 13331 -13332 -13333  0
c  -3 does not represent an automaton state.
c    -( b^{18, 53}_2 ∧  b^{18, 53}_1 ∧  b^{18, 53}_0 ∧ true) 
c  in CNF:
c    -b^{18, 53}_2 ∨ -b^{18, 53}_1 ∨ -b^{18, 53}_0 ∨ false 
c  in DIMACS:
-13331 -13332 -13333  0

c i = 54
c  -2+1 --> -1
c    ( b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧  p_972) -> ( b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0)
c  in CNF:
c    -b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨  b^{18, 55}_2
c    -b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_1
c    -b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨  b^{18, 55}_0
c  in DIMACS:
-13334 -13335  13336 -972  13337 0
-13334 -13335  13336 -972 -13338 0
-13334 -13335  13336 -972  13339 0

c  -1+1 --> 0
c    ( b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0 ∧  p_972) -> (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧ -b^{18, 55}_0)
c  in CNF:
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_2
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_1
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_0
c  in DIMACS:
-13334  13335 -13336 -972 -13337 0
-13334  13335 -13336 -972 -13338 0
-13334  13335 -13336 -972 -13339 0

c  0+1 --> 1
c    (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧  p_972) -> (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0)
c  in CNF:
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_2
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_1
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨  b^{18, 55}_0
c  in DIMACS:
 13334  13335  13336 -972 -13337 0
 13334  13335  13336 -972 -13338 0
 13334  13335  13336 -972  13339 0

c  1+1 --> 2
c    (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0 ∧  p_972) -> (-b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0)
c  in CNF:
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_2
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨  b^{18, 55}_1
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ -p_972 ∨ -b^{18, 55}_0
c  in DIMACS:
 13334  13335 -13336 -972 -13337 0
 13334  13335 -13336 -972  13338 0
 13334  13335 -13336 -972 -13339 0

c  2+1 --> break 
c    (-b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧  p_972) -> break
c  in CNF:
c     b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 13334 -13335  13336 -972 1162 0


c  2-1 --> 1
c    (-b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧ -p_972) -> (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0)
c  in CNF:
c     b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_2
c     b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_1
c     b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨  b^{18, 55}_0
c  in DIMACS:
 13334 -13335  13336  972 -13337 0
 13334 -13335  13336  972 -13338 0
 13334 -13335  13336  972  13339 0

c  1-1 --> 0
c    (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0 ∧ -p_972) -> (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧ -b^{18, 55}_0)
c  in CNF:
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_2
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_1
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_0
c  in DIMACS:
 13334  13335 -13336  972 -13337 0
 13334  13335 -13336  972 -13338 0
 13334  13335 -13336  972 -13339 0

c  0-1 --> -1
c    (-b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧ -p_972) -> ( b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0)
c  in CNF:
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨  b^{18, 55}_2
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_1
c     b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨  b^{18, 55}_0
c  in DIMACS:
 13334  13335  13336  972  13337 0
 13334  13335  13336  972 -13338 0
 13334  13335  13336  972  13339 0

c  -1-1 --> -2
c    ( b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧  b^{18, 54}_0 ∧ -p_972) -> ( b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0)
c  in CNF:
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨  b^{18, 55}_2
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨  b^{18, 55}_1
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨  p_972 ∨ -b^{18, 55}_0
c  in DIMACS:
-13334  13335 -13336  972  13337 0
-13334  13335 -13336  972  13338 0
-13334  13335 -13336  972 -13339 0

c  -2-1 --> break 
c    ( b^{18, 54}_2 ∧  b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨  b^{18, 54}_0 ∨  p_972 ∨ break
c  in DIMACS:
-13334 -13335  13336  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 54}_2 ∧ -b^{18, 54}_1 ∧ -b^{18, 54}_0 ∧ true) 
c  in CNF:
c    -b^{18, 54}_2 ∨  b^{18, 54}_1 ∨  b^{18, 54}_0 ∨ false 
c  in DIMACS:
-13334  13335  13336  0

c  3 does not represent an automaton state.
c    -(-b^{18, 54}_2 ∧  b^{18, 54}_1 ∧  b^{18, 54}_0 ∧ true) 
c  in CNF:
c     b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ false 
c  in DIMACS:
 13334 -13335 -13336  0
c  -3 does not represent an automaton state.
c    -( b^{18, 54}_2 ∧  b^{18, 54}_1 ∧  b^{18, 54}_0 ∧ true) 
c  in CNF:
c    -b^{18, 54}_2 ∨ -b^{18, 54}_1 ∨ -b^{18, 54}_0 ∨ false 
c  in DIMACS:
-13334 -13335 -13336  0

c i = 55
c  -2+1 --> -1
c    ( b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧  p_990) -> ( b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0)
c  in CNF:
c    -b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨  b^{18, 56}_2
c    -b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_1
c    -b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨  b^{18, 56}_0
c  in DIMACS:
-13337 -13338  13339 -990  13340 0
-13337 -13338  13339 -990 -13341 0
-13337 -13338  13339 -990  13342 0

c  -1+1 --> 0
c    ( b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0 ∧  p_990) -> (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧ -b^{18, 56}_0)
c  in CNF:
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_2
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_1
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_0
c  in DIMACS:
-13337  13338 -13339 -990 -13340 0
-13337  13338 -13339 -990 -13341 0
-13337  13338 -13339 -990 -13342 0

c  0+1 --> 1
c    (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧  p_990) -> (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0)
c  in CNF:
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_2
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_1
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨  b^{18, 56}_0
c  in DIMACS:
 13337  13338  13339 -990 -13340 0
 13337  13338  13339 -990 -13341 0
 13337  13338  13339 -990  13342 0

c  1+1 --> 2
c    (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0 ∧  p_990) -> (-b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0)
c  in CNF:
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_2
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨  b^{18, 56}_1
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ -p_990 ∨ -b^{18, 56}_0
c  in DIMACS:
 13337  13338 -13339 -990 -13340 0
 13337  13338 -13339 -990  13341 0
 13337  13338 -13339 -990 -13342 0

c  2+1 --> break 
c    (-b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧  p_990) -> break
c  in CNF:
c     b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 13337 -13338  13339 -990 1162 0


c  2-1 --> 1
c    (-b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧ -p_990) -> (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0)
c  in CNF:
c     b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_2
c     b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_1
c     b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨  b^{18, 56}_0
c  in DIMACS:
 13337 -13338  13339  990 -13340 0
 13337 -13338  13339  990 -13341 0
 13337 -13338  13339  990  13342 0

c  1-1 --> 0
c    (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0 ∧ -p_990) -> (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧ -b^{18, 56}_0)
c  in CNF:
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_2
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_1
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_0
c  in DIMACS:
 13337  13338 -13339  990 -13340 0
 13337  13338 -13339  990 -13341 0
 13337  13338 -13339  990 -13342 0

c  0-1 --> -1
c    (-b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧ -p_990) -> ( b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0)
c  in CNF:
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨  b^{18, 56}_2
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_1
c     b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨  b^{18, 56}_0
c  in DIMACS:
 13337  13338  13339  990  13340 0
 13337  13338  13339  990 -13341 0
 13337  13338  13339  990  13342 0

c  -1-1 --> -2
c    ( b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧  b^{18, 55}_0 ∧ -p_990) -> ( b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0)
c  in CNF:
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨  b^{18, 56}_2
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨  b^{18, 56}_1
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨  p_990 ∨ -b^{18, 56}_0
c  in DIMACS:
-13337  13338 -13339  990  13340 0
-13337  13338 -13339  990  13341 0
-13337  13338 -13339  990 -13342 0

c  -2-1 --> break 
c    ( b^{18, 55}_2 ∧  b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨  b^{18, 55}_0 ∨  p_990 ∨ break
c  in DIMACS:
-13337 -13338  13339  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 55}_2 ∧ -b^{18, 55}_1 ∧ -b^{18, 55}_0 ∧ true) 
c  in CNF:
c    -b^{18, 55}_2 ∨  b^{18, 55}_1 ∨  b^{18, 55}_0 ∨ false 
c  in DIMACS:
-13337  13338  13339  0

c  3 does not represent an automaton state.
c    -(-b^{18, 55}_2 ∧  b^{18, 55}_1 ∧  b^{18, 55}_0 ∧ true) 
c  in CNF:
c     b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ false 
c  in DIMACS:
 13337 -13338 -13339  0
c  -3 does not represent an automaton state.
c    -( b^{18, 55}_2 ∧  b^{18, 55}_1 ∧  b^{18, 55}_0 ∧ true) 
c  in CNF:
c    -b^{18, 55}_2 ∨ -b^{18, 55}_1 ∨ -b^{18, 55}_0 ∨ false 
c  in DIMACS:
-13337 -13338 -13339  0

c i = 56
c  -2+1 --> -1
c    ( b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧  p_1008) -> ( b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0)
c  in CNF:
c    -b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨  b^{18, 57}_2
c    -b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_1
c    -b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨  b^{18, 57}_0
c  in DIMACS:
-13340 -13341  13342 -1008  13343 0
-13340 -13341  13342 -1008 -13344 0
-13340 -13341  13342 -1008  13345 0

c  -1+1 --> 0
c    ( b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0 ∧  p_1008) -> (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧ -b^{18, 57}_0)
c  in CNF:
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_2
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_1
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_0
c  in DIMACS:
-13340  13341 -13342 -1008 -13343 0
-13340  13341 -13342 -1008 -13344 0
-13340  13341 -13342 -1008 -13345 0

c  0+1 --> 1
c    (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧  p_1008) -> (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0)
c  in CNF:
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_2
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_1
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨  b^{18, 57}_0
c  in DIMACS:
 13340  13341  13342 -1008 -13343 0
 13340  13341  13342 -1008 -13344 0
 13340  13341  13342 -1008  13345 0

c  1+1 --> 2
c    (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0 ∧  p_1008) -> (-b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0)
c  in CNF:
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_2
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨  b^{18, 57}_1
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ -p_1008 ∨ -b^{18, 57}_0
c  in DIMACS:
 13340  13341 -13342 -1008 -13343 0
 13340  13341 -13342 -1008  13344 0
 13340  13341 -13342 -1008 -13345 0

c  2+1 --> break 
c    (-b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 13340 -13341  13342 -1008 1162 0


c  2-1 --> 1
c    (-b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧ -p_1008) -> (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0)
c  in CNF:
c     b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_2
c     b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_1
c     b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨  b^{18, 57}_0
c  in DIMACS:
 13340 -13341  13342  1008 -13343 0
 13340 -13341  13342  1008 -13344 0
 13340 -13341  13342  1008  13345 0

c  1-1 --> 0
c    (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0 ∧ -p_1008) -> (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧ -b^{18, 57}_0)
c  in CNF:
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_2
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_1
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_0
c  in DIMACS:
 13340  13341 -13342  1008 -13343 0
 13340  13341 -13342  1008 -13344 0
 13340  13341 -13342  1008 -13345 0

c  0-1 --> -1
c    (-b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧ -p_1008) -> ( b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0)
c  in CNF:
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨  b^{18, 57}_2
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_1
c     b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨  b^{18, 57}_0
c  in DIMACS:
 13340  13341  13342  1008  13343 0
 13340  13341  13342  1008 -13344 0
 13340  13341  13342  1008  13345 0

c  -1-1 --> -2
c    ( b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧  b^{18, 56}_0 ∧ -p_1008) -> ( b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0)
c  in CNF:
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨  b^{18, 57}_2
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨  b^{18, 57}_1
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨  p_1008 ∨ -b^{18, 57}_0
c  in DIMACS:
-13340  13341 -13342  1008  13343 0
-13340  13341 -13342  1008  13344 0
-13340  13341 -13342  1008 -13345 0

c  -2-1 --> break 
c    ( b^{18, 56}_2 ∧  b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨  b^{18, 56}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-13340 -13341  13342  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 56}_2 ∧ -b^{18, 56}_1 ∧ -b^{18, 56}_0 ∧ true) 
c  in CNF:
c    -b^{18, 56}_2 ∨  b^{18, 56}_1 ∨  b^{18, 56}_0 ∨ false 
c  in DIMACS:
-13340  13341  13342  0

c  3 does not represent an automaton state.
c    -(-b^{18, 56}_2 ∧  b^{18, 56}_1 ∧  b^{18, 56}_0 ∧ true) 
c  in CNF:
c     b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ false 
c  in DIMACS:
 13340 -13341 -13342  0
c  -3 does not represent an automaton state.
c    -( b^{18, 56}_2 ∧  b^{18, 56}_1 ∧  b^{18, 56}_0 ∧ true) 
c  in CNF:
c    -b^{18, 56}_2 ∨ -b^{18, 56}_1 ∨ -b^{18, 56}_0 ∨ false 
c  in DIMACS:
-13340 -13341 -13342  0

c i = 57
c  -2+1 --> -1
c    ( b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧  p_1026) -> ( b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0)
c  in CNF:
c    -b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨  b^{18, 58}_2
c    -b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_1
c    -b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨  b^{18, 58}_0
c  in DIMACS:
-13343 -13344  13345 -1026  13346 0
-13343 -13344  13345 -1026 -13347 0
-13343 -13344  13345 -1026  13348 0

c  -1+1 --> 0
c    ( b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0 ∧  p_1026) -> (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧ -b^{18, 58}_0)
c  in CNF:
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_2
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_1
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_0
c  in DIMACS:
-13343  13344 -13345 -1026 -13346 0
-13343  13344 -13345 -1026 -13347 0
-13343  13344 -13345 -1026 -13348 0

c  0+1 --> 1
c    (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧  p_1026) -> (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0)
c  in CNF:
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_2
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_1
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨  b^{18, 58}_0
c  in DIMACS:
 13343  13344  13345 -1026 -13346 0
 13343  13344  13345 -1026 -13347 0
 13343  13344  13345 -1026  13348 0

c  1+1 --> 2
c    (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0 ∧  p_1026) -> (-b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0)
c  in CNF:
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_2
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨  b^{18, 58}_1
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ -p_1026 ∨ -b^{18, 58}_0
c  in DIMACS:
 13343  13344 -13345 -1026 -13346 0
 13343  13344 -13345 -1026  13347 0
 13343  13344 -13345 -1026 -13348 0

c  2+1 --> break 
c    (-b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 13343 -13344  13345 -1026 1162 0


c  2-1 --> 1
c    (-b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧ -p_1026) -> (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0)
c  in CNF:
c     b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_2
c     b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_1
c     b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨  b^{18, 58}_0
c  in DIMACS:
 13343 -13344  13345  1026 -13346 0
 13343 -13344  13345  1026 -13347 0
 13343 -13344  13345  1026  13348 0

c  1-1 --> 0
c    (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0 ∧ -p_1026) -> (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧ -b^{18, 58}_0)
c  in CNF:
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_2
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_1
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_0
c  in DIMACS:
 13343  13344 -13345  1026 -13346 0
 13343  13344 -13345  1026 -13347 0
 13343  13344 -13345  1026 -13348 0

c  0-1 --> -1
c    (-b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧ -p_1026) -> ( b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0)
c  in CNF:
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨  b^{18, 58}_2
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_1
c     b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨  b^{18, 58}_0
c  in DIMACS:
 13343  13344  13345  1026  13346 0
 13343  13344  13345  1026 -13347 0
 13343  13344  13345  1026  13348 0

c  -1-1 --> -2
c    ( b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧  b^{18, 57}_0 ∧ -p_1026) -> ( b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0)
c  in CNF:
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨  b^{18, 58}_2
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨  b^{18, 58}_1
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨  p_1026 ∨ -b^{18, 58}_0
c  in DIMACS:
-13343  13344 -13345  1026  13346 0
-13343  13344 -13345  1026  13347 0
-13343  13344 -13345  1026 -13348 0

c  -2-1 --> break 
c    ( b^{18, 57}_2 ∧  b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨  b^{18, 57}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-13343 -13344  13345  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 57}_2 ∧ -b^{18, 57}_1 ∧ -b^{18, 57}_0 ∧ true) 
c  in CNF:
c    -b^{18, 57}_2 ∨  b^{18, 57}_1 ∨  b^{18, 57}_0 ∨ false 
c  in DIMACS:
-13343  13344  13345  0

c  3 does not represent an automaton state.
c    -(-b^{18, 57}_2 ∧  b^{18, 57}_1 ∧  b^{18, 57}_0 ∧ true) 
c  in CNF:
c     b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ false 
c  in DIMACS:
 13343 -13344 -13345  0
c  -3 does not represent an automaton state.
c    -( b^{18, 57}_2 ∧  b^{18, 57}_1 ∧  b^{18, 57}_0 ∧ true) 
c  in CNF:
c    -b^{18, 57}_2 ∨ -b^{18, 57}_1 ∨ -b^{18, 57}_0 ∨ false 
c  in DIMACS:
-13343 -13344 -13345  0

c i = 58
c  -2+1 --> -1
c    ( b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧  p_1044) -> ( b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0)
c  in CNF:
c    -b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨  b^{18, 59}_2
c    -b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_1
c    -b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨  b^{18, 59}_0
c  in DIMACS:
-13346 -13347  13348 -1044  13349 0
-13346 -13347  13348 -1044 -13350 0
-13346 -13347  13348 -1044  13351 0

c  -1+1 --> 0
c    ( b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0 ∧  p_1044) -> (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧ -b^{18, 59}_0)
c  in CNF:
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_2
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_1
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_0
c  in DIMACS:
-13346  13347 -13348 -1044 -13349 0
-13346  13347 -13348 -1044 -13350 0
-13346  13347 -13348 -1044 -13351 0

c  0+1 --> 1
c    (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧  p_1044) -> (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0)
c  in CNF:
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_2
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_1
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨  b^{18, 59}_0
c  in DIMACS:
 13346  13347  13348 -1044 -13349 0
 13346  13347  13348 -1044 -13350 0
 13346  13347  13348 -1044  13351 0

c  1+1 --> 2
c    (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0 ∧  p_1044) -> (-b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0)
c  in CNF:
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_2
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨  b^{18, 59}_1
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ -p_1044 ∨ -b^{18, 59}_0
c  in DIMACS:
 13346  13347 -13348 -1044 -13349 0
 13346  13347 -13348 -1044  13350 0
 13346  13347 -13348 -1044 -13351 0

c  2+1 --> break 
c    (-b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 13346 -13347  13348 -1044 1162 0


c  2-1 --> 1
c    (-b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧ -p_1044) -> (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0)
c  in CNF:
c     b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_2
c     b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_1
c     b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨  b^{18, 59}_0
c  in DIMACS:
 13346 -13347  13348  1044 -13349 0
 13346 -13347  13348  1044 -13350 0
 13346 -13347  13348  1044  13351 0

c  1-1 --> 0
c    (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0 ∧ -p_1044) -> (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧ -b^{18, 59}_0)
c  in CNF:
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_2
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_1
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_0
c  in DIMACS:
 13346  13347 -13348  1044 -13349 0
 13346  13347 -13348  1044 -13350 0
 13346  13347 -13348  1044 -13351 0

c  0-1 --> -1
c    (-b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧ -p_1044) -> ( b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0)
c  in CNF:
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨  b^{18, 59}_2
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_1
c     b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨  b^{18, 59}_0
c  in DIMACS:
 13346  13347  13348  1044  13349 0
 13346  13347  13348  1044 -13350 0
 13346  13347  13348  1044  13351 0

c  -1-1 --> -2
c    ( b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧  b^{18, 58}_0 ∧ -p_1044) -> ( b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0)
c  in CNF:
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨  b^{18, 59}_2
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨  b^{18, 59}_1
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨  p_1044 ∨ -b^{18, 59}_0
c  in DIMACS:
-13346  13347 -13348  1044  13349 0
-13346  13347 -13348  1044  13350 0
-13346  13347 -13348  1044 -13351 0

c  -2-1 --> break 
c    ( b^{18, 58}_2 ∧  b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨  b^{18, 58}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-13346 -13347  13348  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 58}_2 ∧ -b^{18, 58}_1 ∧ -b^{18, 58}_0 ∧ true) 
c  in CNF:
c    -b^{18, 58}_2 ∨  b^{18, 58}_1 ∨  b^{18, 58}_0 ∨ false 
c  in DIMACS:
-13346  13347  13348  0

c  3 does not represent an automaton state.
c    -(-b^{18, 58}_2 ∧  b^{18, 58}_1 ∧  b^{18, 58}_0 ∧ true) 
c  in CNF:
c     b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ false 
c  in DIMACS:
 13346 -13347 -13348  0
c  -3 does not represent an automaton state.
c    -( b^{18, 58}_2 ∧  b^{18, 58}_1 ∧  b^{18, 58}_0 ∧ true) 
c  in CNF:
c    -b^{18, 58}_2 ∨ -b^{18, 58}_1 ∨ -b^{18, 58}_0 ∨ false 
c  in DIMACS:
-13346 -13347 -13348  0

c i = 59
c  -2+1 --> -1
c    ( b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧  p_1062) -> ( b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0)
c  in CNF:
c    -b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨  b^{18, 60}_2
c    -b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_1
c    -b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨  b^{18, 60}_0
c  in DIMACS:
-13349 -13350  13351 -1062  13352 0
-13349 -13350  13351 -1062 -13353 0
-13349 -13350  13351 -1062  13354 0

c  -1+1 --> 0
c    ( b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0 ∧  p_1062) -> (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧ -b^{18, 60}_0)
c  in CNF:
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_2
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_1
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_0
c  in DIMACS:
-13349  13350 -13351 -1062 -13352 0
-13349  13350 -13351 -1062 -13353 0
-13349  13350 -13351 -1062 -13354 0

c  0+1 --> 1
c    (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧  p_1062) -> (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0)
c  in CNF:
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_2
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_1
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨  b^{18, 60}_0
c  in DIMACS:
 13349  13350  13351 -1062 -13352 0
 13349  13350  13351 -1062 -13353 0
 13349  13350  13351 -1062  13354 0

c  1+1 --> 2
c    (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0 ∧  p_1062) -> (-b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0)
c  in CNF:
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_2
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨  b^{18, 60}_1
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ -p_1062 ∨ -b^{18, 60}_0
c  in DIMACS:
 13349  13350 -13351 -1062 -13352 0
 13349  13350 -13351 -1062  13353 0
 13349  13350 -13351 -1062 -13354 0

c  2+1 --> break 
c    (-b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 13349 -13350  13351 -1062 1162 0


c  2-1 --> 1
c    (-b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧ -p_1062) -> (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0)
c  in CNF:
c     b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_2
c     b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_1
c     b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨  b^{18, 60}_0
c  in DIMACS:
 13349 -13350  13351  1062 -13352 0
 13349 -13350  13351  1062 -13353 0
 13349 -13350  13351  1062  13354 0

c  1-1 --> 0
c    (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0 ∧ -p_1062) -> (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧ -b^{18, 60}_0)
c  in CNF:
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_2
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_1
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_0
c  in DIMACS:
 13349  13350 -13351  1062 -13352 0
 13349  13350 -13351  1062 -13353 0
 13349  13350 -13351  1062 -13354 0

c  0-1 --> -1
c    (-b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧ -p_1062) -> ( b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0)
c  in CNF:
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨  b^{18, 60}_2
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_1
c     b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨  b^{18, 60}_0
c  in DIMACS:
 13349  13350  13351  1062  13352 0
 13349  13350  13351  1062 -13353 0
 13349  13350  13351  1062  13354 0

c  -1-1 --> -2
c    ( b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧  b^{18, 59}_0 ∧ -p_1062) -> ( b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0)
c  in CNF:
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨  b^{18, 60}_2
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨  b^{18, 60}_1
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨  p_1062 ∨ -b^{18, 60}_0
c  in DIMACS:
-13349  13350 -13351  1062  13352 0
-13349  13350 -13351  1062  13353 0
-13349  13350 -13351  1062 -13354 0

c  -2-1 --> break 
c    ( b^{18, 59}_2 ∧  b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨  b^{18, 59}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-13349 -13350  13351  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 59}_2 ∧ -b^{18, 59}_1 ∧ -b^{18, 59}_0 ∧ true) 
c  in CNF:
c    -b^{18, 59}_2 ∨  b^{18, 59}_1 ∨  b^{18, 59}_0 ∨ false 
c  in DIMACS:
-13349  13350  13351  0

c  3 does not represent an automaton state.
c    -(-b^{18, 59}_2 ∧  b^{18, 59}_1 ∧  b^{18, 59}_0 ∧ true) 
c  in CNF:
c     b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ false 
c  in DIMACS:
 13349 -13350 -13351  0
c  -3 does not represent an automaton state.
c    -( b^{18, 59}_2 ∧  b^{18, 59}_1 ∧  b^{18, 59}_0 ∧ true) 
c  in CNF:
c    -b^{18, 59}_2 ∨ -b^{18, 59}_1 ∨ -b^{18, 59}_0 ∨ false 
c  in DIMACS:
-13349 -13350 -13351  0

c i = 60
c  -2+1 --> -1
c    ( b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧  p_1080) -> ( b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0)
c  in CNF:
c    -b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨  b^{18, 61}_2
c    -b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_1
c    -b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨  b^{18, 61}_0
c  in DIMACS:
-13352 -13353  13354 -1080  13355 0
-13352 -13353  13354 -1080 -13356 0
-13352 -13353  13354 -1080  13357 0

c  -1+1 --> 0
c    ( b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0 ∧  p_1080) -> (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧ -b^{18, 61}_0)
c  in CNF:
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_2
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_1
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_0
c  in DIMACS:
-13352  13353 -13354 -1080 -13355 0
-13352  13353 -13354 -1080 -13356 0
-13352  13353 -13354 -1080 -13357 0

c  0+1 --> 1
c    (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧  p_1080) -> (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0)
c  in CNF:
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_2
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_1
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨  b^{18, 61}_0
c  in DIMACS:
 13352  13353  13354 -1080 -13355 0
 13352  13353  13354 -1080 -13356 0
 13352  13353  13354 -1080  13357 0

c  1+1 --> 2
c    (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0 ∧  p_1080) -> (-b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0)
c  in CNF:
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_2
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨  b^{18, 61}_1
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ -p_1080 ∨ -b^{18, 61}_0
c  in DIMACS:
 13352  13353 -13354 -1080 -13355 0
 13352  13353 -13354 -1080  13356 0
 13352  13353 -13354 -1080 -13357 0

c  2+1 --> break 
c    (-b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 13352 -13353  13354 -1080 1162 0


c  2-1 --> 1
c    (-b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧ -p_1080) -> (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0)
c  in CNF:
c     b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_2
c     b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_1
c     b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨  b^{18, 61}_0
c  in DIMACS:
 13352 -13353  13354  1080 -13355 0
 13352 -13353  13354  1080 -13356 0
 13352 -13353  13354  1080  13357 0

c  1-1 --> 0
c    (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0 ∧ -p_1080) -> (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧ -b^{18, 61}_0)
c  in CNF:
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_2
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_1
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_0
c  in DIMACS:
 13352  13353 -13354  1080 -13355 0
 13352  13353 -13354  1080 -13356 0
 13352  13353 -13354  1080 -13357 0

c  0-1 --> -1
c    (-b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧ -p_1080) -> ( b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0)
c  in CNF:
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨  b^{18, 61}_2
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_1
c     b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨  b^{18, 61}_0
c  in DIMACS:
 13352  13353  13354  1080  13355 0
 13352  13353  13354  1080 -13356 0
 13352  13353  13354  1080  13357 0

c  -1-1 --> -2
c    ( b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧  b^{18, 60}_0 ∧ -p_1080) -> ( b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0)
c  in CNF:
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨  b^{18, 61}_2
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨  b^{18, 61}_1
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨  p_1080 ∨ -b^{18, 61}_0
c  in DIMACS:
-13352  13353 -13354  1080  13355 0
-13352  13353 -13354  1080  13356 0
-13352  13353 -13354  1080 -13357 0

c  -2-1 --> break 
c    ( b^{18, 60}_2 ∧  b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨  b^{18, 60}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-13352 -13353  13354  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 60}_2 ∧ -b^{18, 60}_1 ∧ -b^{18, 60}_0 ∧ true) 
c  in CNF:
c    -b^{18, 60}_2 ∨  b^{18, 60}_1 ∨  b^{18, 60}_0 ∨ false 
c  in DIMACS:
-13352  13353  13354  0

c  3 does not represent an automaton state.
c    -(-b^{18, 60}_2 ∧  b^{18, 60}_1 ∧  b^{18, 60}_0 ∧ true) 
c  in CNF:
c     b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ false 
c  in DIMACS:
 13352 -13353 -13354  0
c  -3 does not represent an automaton state.
c    -( b^{18, 60}_2 ∧  b^{18, 60}_1 ∧  b^{18, 60}_0 ∧ true) 
c  in CNF:
c    -b^{18, 60}_2 ∨ -b^{18, 60}_1 ∨ -b^{18, 60}_0 ∨ false 
c  in DIMACS:
-13352 -13353 -13354  0

c i = 61
c  -2+1 --> -1
c    ( b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧  p_1098) -> ( b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0)
c  in CNF:
c    -b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨  b^{18, 62}_2
c    -b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_1
c    -b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨  b^{18, 62}_0
c  in DIMACS:
-13355 -13356  13357 -1098  13358 0
-13355 -13356  13357 -1098 -13359 0
-13355 -13356  13357 -1098  13360 0

c  -1+1 --> 0
c    ( b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0 ∧  p_1098) -> (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧ -b^{18, 62}_0)
c  in CNF:
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_2
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_1
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_0
c  in DIMACS:
-13355  13356 -13357 -1098 -13358 0
-13355  13356 -13357 -1098 -13359 0
-13355  13356 -13357 -1098 -13360 0

c  0+1 --> 1
c    (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧  p_1098) -> (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0)
c  in CNF:
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_2
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_1
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨  b^{18, 62}_0
c  in DIMACS:
 13355  13356  13357 -1098 -13358 0
 13355  13356  13357 -1098 -13359 0
 13355  13356  13357 -1098  13360 0

c  1+1 --> 2
c    (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0 ∧  p_1098) -> (-b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0)
c  in CNF:
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_2
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨  b^{18, 62}_1
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ -p_1098 ∨ -b^{18, 62}_0
c  in DIMACS:
 13355  13356 -13357 -1098 -13358 0
 13355  13356 -13357 -1098  13359 0
 13355  13356 -13357 -1098 -13360 0

c  2+1 --> break 
c    (-b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 13355 -13356  13357 -1098 1162 0


c  2-1 --> 1
c    (-b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧ -p_1098) -> (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0)
c  in CNF:
c     b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_2
c     b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_1
c     b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨  b^{18, 62}_0
c  in DIMACS:
 13355 -13356  13357  1098 -13358 0
 13355 -13356  13357  1098 -13359 0
 13355 -13356  13357  1098  13360 0

c  1-1 --> 0
c    (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0 ∧ -p_1098) -> (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧ -b^{18, 62}_0)
c  in CNF:
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_2
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_1
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_0
c  in DIMACS:
 13355  13356 -13357  1098 -13358 0
 13355  13356 -13357  1098 -13359 0
 13355  13356 -13357  1098 -13360 0

c  0-1 --> -1
c    (-b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧ -p_1098) -> ( b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0)
c  in CNF:
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨  b^{18, 62}_2
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_1
c     b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨  b^{18, 62}_0
c  in DIMACS:
 13355  13356  13357  1098  13358 0
 13355  13356  13357  1098 -13359 0
 13355  13356  13357  1098  13360 0

c  -1-1 --> -2
c    ( b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧  b^{18, 61}_0 ∧ -p_1098) -> ( b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0)
c  in CNF:
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨  b^{18, 62}_2
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨  b^{18, 62}_1
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨  p_1098 ∨ -b^{18, 62}_0
c  in DIMACS:
-13355  13356 -13357  1098  13358 0
-13355  13356 -13357  1098  13359 0
-13355  13356 -13357  1098 -13360 0

c  -2-1 --> break 
c    ( b^{18, 61}_2 ∧  b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨  b^{18, 61}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-13355 -13356  13357  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 61}_2 ∧ -b^{18, 61}_1 ∧ -b^{18, 61}_0 ∧ true) 
c  in CNF:
c    -b^{18, 61}_2 ∨  b^{18, 61}_1 ∨  b^{18, 61}_0 ∨ false 
c  in DIMACS:
-13355  13356  13357  0

c  3 does not represent an automaton state.
c    -(-b^{18, 61}_2 ∧  b^{18, 61}_1 ∧  b^{18, 61}_0 ∧ true) 
c  in CNF:
c     b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ false 
c  in DIMACS:
 13355 -13356 -13357  0
c  -3 does not represent an automaton state.
c    -( b^{18, 61}_2 ∧  b^{18, 61}_1 ∧  b^{18, 61}_0 ∧ true) 
c  in CNF:
c    -b^{18, 61}_2 ∨ -b^{18, 61}_1 ∨ -b^{18, 61}_0 ∨ false 
c  in DIMACS:
-13355 -13356 -13357  0

c i = 62
c  -2+1 --> -1
c    ( b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧  p_1116) -> ( b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0)
c  in CNF:
c    -b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨  b^{18, 63}_2
c    -b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_1
c    -b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨  b^{18, 63}_0
c  in DIMACS:
-13358 -13359  13360 -1116  13361 0
-13358 -13359  13360 -1116 -13362 0
-13358 -13359  13360 -1116  13363 0

c  -1+1 --> 0
c    ( b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0 ∧  p_1116) -> (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧ -b^{18, 63}_0)
c  in CNF:
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_2
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_1
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_0
c  in DIMACS:
-13358  13359 -13360 -1116 -13361 0
-13358  13359 -13360 -1116 -13362 0
-13358  13359 -13360 -1116 -13363 0

c  0+1 --> 1
c    (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧  p_1116) -> (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0)
c  in CNF:
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_2
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_1
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨  b^{18, 63}_0
c  in DIMACS:
 13358  13359  13360 -1116 -13361 0
 13358  13359  13360 -1116 -13362 0
 13358  13359  13360 -1116  13363 0

c  1+1 --> 2
c    (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0 ∧  p_1116) -> (-b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0)
c  in CNF:
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_2
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨  b^{18, 63}_1
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ -p_1116 ∨ -b^{18, 63}_0
c  in DIMACS:
 13358  13359 -13360 -1116 -13361 0
 13358  13359 -13360 -1116  13362 0
 13358  13359 -13360 -1116 -13363 0

c  2+1 --> break 
c    (-b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 13358 -13359  13360 -1116 1162 0


c  2-1 --> 1
c    (-b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧ -p_1116) -> (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0)
c  in CNF:
c     b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_2
c     b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_1
c     b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨  b^{18, 63}_0
c  in DIMACS:
 13358 -13359  13360  1116 -13361 0
 13358 -13359  13360  1116 -13362 0
 13358 -13359  13360  1116  13363 0

c  1-1 --> 0
c    (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0 ∧ -p_1116) -> (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧ -b^{18, 63}_0)
c  in CNF:
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_2
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_1
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_0
c  in DIMACS:
 13358  13359 -13360  1116 -13361 0
 13358  13359 -13360  1116 -13362 0
 13358  13359 -13360  1116 -13363 0

c  0-1 --> -1
c    (-b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧ -p_1116) -> ( b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0)
c  in CNF:
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨  b^{18, 63}_2
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_1
c     b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨  b^{18, 63}_0
c  in DIMACS:
 13358  13359  13360  1116  13361 0
 13358  13359  13360  1116 -13362 0
 13358  13359  13360  1116  13363 0

c  -1-1 --> -2
c    ( b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧  b^{18, 62}_0 ∧ -p_1116) -> ( b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0)
c  in CNF:
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨  b^{18, 63}_2
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨  b^{18, 63}_1
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨  p_1116 ∨ -b^{18, 63}_0
c  in DIMACS:
-13358  13359 -13360  1116  13361 0
-13358  13359 -13360  1116  13362 0
-13358  13359 -13360  1116 -13363 0

c  -2-1 --> break 
c    ( b^{18, 62}_2 ∧  b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨  b^{18, 62}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-13358 -13359  13360  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 62}_2 ∧ -b^{18, 62}_1 ∧ -b^{18, 62}_0 ∧ true) 
c  in CNF:
c    -b^{18, 62}_2 ∨  b^{18, 62}_1 ∨  b^{18, 62}_0 ∨ false 
c  in DIMACS:
-13358  13359  13360  0

c  3 does not represent an automaton state.
c    -(-b^{18, 62}_2 ∧  b^{18, 62}_1 ∧  b^{18, 62}_0 ∧ true) 
c  in CNF:
c     b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ false 
c  in DIMACS:
 13358 -13359 -13360  0
c  -3 does not represent an automaton state.
c    -( b^{18, 62}_2 ∧  b^{18, 62}_1 ∧  b^{18, 62}_0 ∧ true) 
c  in CNF:
c    -b^{18, 62}_2 ∨ -b^{18, 62}_1 ∨ -b^{18, 62}_0 ∨ false 
c  in DIMACS:
-13358 -13359 -13360  0

c i = 63
c  -2+1 --> -1
c    ( b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧  p_1134) -> ( b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0)
c  in CNF:
c    -b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨  b^{18, 64}_2
c    -b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_1
c    -b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨  b^{18, 64}_0
c  in DIMACS:
-13361 -13362  13363 -1134  13364 0
-13361 -13362  13363 -1134 -13365 0
-13361 -13362  13363 -1134  13366 0

c  -1+1 --> 0
c    ( b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0 ∧  p_1134) -> (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧ -b^{18, 64}_0)
c  in CNF:
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_2
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_1
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_0
c  in DIMACS:
-13361  13362 -13363 -1134 -13364 0
-13361  13362 -13363 -1134 -13365 0
-13361  13362 -13363 -1134 -13366 0

c  0+1 --> 1
c    (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧  p_1134) -> (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0)
c  in CNF:
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_2
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_1
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨  b^{18, 64}_0
c  in DIMACS:
 13361  13362  13363 -1134 -13364 0
 13361  13362  13363 -1134 -13365 0
 13361  13362  13363 -1134  13366 0

c  1+1 --> 2
c    (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0 ∧  p_1134) -> (-b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0)
c  in CNF:
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_2
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨  b^{18, 64}_1
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ -p_1134 ∨ -b^{18, 64}_0
c  in DIMACS:
 13361  13362 -13363 -1134 -13364 0
 13361  13362 -13363 -1134  13365 0
 13361  13362 -13363 -1134 -13366 0

c  2+1 --> break 
c    (-b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 13361 -13362  13363 -1134 1162 0


c  2-1 --> 1
c    (-b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧ -p_1134) -> (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0)
c  in CNF:
c     b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_2
c     b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_1
c     b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨  b^{18, 64}_0
c  in DIMACS:
 13361 -13362  13363  1134 -13364 0
 13361 -13362  13363  1134 -13365 0
 13361 -13362  13363  1134  13366 0

c  1-1 --> 0
c    (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0 ∧ -p_1134) -> (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧ -b^{18, 64}_0)
c  in CNF:
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_2
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_1
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_0
c  in DIMACS:
 13361  13362 -13363  1134 -13364 0
 13361  13362 -13363  1134 -13365 0
 13361  13362 -13363  1134 -13366 0

c  0-1 --> -1
c    (-b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧ -p_1134) -> ( b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0)
c  in CNF:
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨  b^{18, 64}_2
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_1
c     b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨  b^{18, 64}_0
c  in DIMACS:
 13361  13362  13363  1134  13364 0
 13361  13362  13363  1134 -13365 0
 13361  13362  13363  1134  13366 0

c  -1-1 --> -2
c    ( b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧  b^{18, 63}_0 ∧ -p_1134) -> ( b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0)
c  in CNF:
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨  b^{18, 64}_2
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨  b^{18, 64}_1
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨  p_1134 ∨ -b^{18, 64}_0
c  in DIMACS:
-13361  13362 -13363  1134  13364 0
-13361  13362 -13363  1134  13365 0
-13361  13362 -13363  1134 -13366 0

c  -2-1 --> break 
c    ( b^{18, 63}_2 ∧  b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨  b^{18, 63}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-13361 -13362  13363  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 63}_2 ∧ -b^{18, 63}_1 ∧ -b^{18, 63}_0 ∧ true) 
c  in CNF:
c    -b^{18, 63}_2 ∨  b^{18, 63}_1 ∨  b^{18, 63}_0 ∨ false 
c  in DIMACS:
-13361  13362  13363  0

c  3 does not represent an automaton state.
c    -(-b^{18, 63}_2 ∧  b^{18, 63}_1 ∧  b^{18, 63}_0 ∧ true) 
c  in CNF:
c     b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ false 
c  in DIMACS:
 13361 -13362 -13363  0
c  -3 does not represent an automaton state.
c    -( b^{18, 63}_2 ∧  b^{18, 63}_1 ∧  b^{18, 63}_0 ∧ true) 
c  in CNF:
c    -b^{18, 63}_2 ∨ -b^{18, 63}_1 ∨ -b^{18, 63}_0 ∨ false 
c  in DIMACS:
-13361 -13362 -13363  0

c i = 64
c  -2+1 --> -1
c    ( b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧  p_1152) -> ( b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧  b^{18, 65}_0)
c  in CNF:
c    -b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨  b^{18, 65}_2
c    -b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_1
c    -b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨  b^{18, 65}_0
c  in DIMACS:
-13364 -13365  13366 -1152  13367 0
-13364 -13365  13366 -1152 -13368 0
-13364 -13365  13366 -1152  13369 0

c  -1+1 --> 0
c    ( b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0 ∧  p_1152) -> (-b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧ -b^{18, 65}_0)
c  in CNF:
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_2
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_1
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_0
c  in DIMACS:
-13364  13365 -13366 -1152 -13367 0
-13364  13365 -13366 -1152 -13368 0
-13364  13365 -13366 -1152 -13369 0

c  0+1 --> 1
c    (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧  p_1152) -> (-b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧  b^{18, 65}_0)
c  in CNF:
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_2
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_1
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨  b^{18, 65}_0
c  in DIMACS:
 13364  13365  13366 -1152 -13367 0
 13364  13365  13366 -1152 -13368 0
 13364  13365  13366 -1152  13369 0

c  1+1 --> 2
c    (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0 ∧  p_1152) -> (-b^{18, 65}_2 ∧  b^{18, 65}_1 ∧ -b^{18, 65}_0)
c  in CNF:
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_2
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨  b^{18, 65}_1
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ -p_1152 ∨ -b^{18, 65}_0
c  in DIMACS:
 13364  13365 -13366 -1152 -13367 0
 13364  13365 -13366 -1152  13368 0
 13364  13365 -13366 -1152 -13369 0

c  2+1 --> break 
c    (-b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 13364 -13365  13366 -1152 1162 0


c  2-1 --> 1
c    (-b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧ -p_1152) -> (-b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧  b^{18, 65}_0)
c  in CNF:
c     b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_2
c     b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_1
c     b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨  b^{18, 65}_0
c  in DIMACS:
 13364 -13365  13366  1152 -13367 0
 13364 -13365  13366  1152 -13368 0
 13364 -13365  13366  1152  13369 0

c  1-1 --> 0
c    (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0 ∧ -p_1152) -> (-b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧ -b^{18, 65}_0)
c  in CNF:
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_2
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_1
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_0
c  in DIMACS:
 13364  13365 -13366  1152 -13367 0
 13364  13365 -13366  1152 -13368 0
 13364  13365 -13366  1152 -13369 0

c  0-1 --> -1
c    (-b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧ -p_1152) -> ( b^{18, 65}_2 ∧ -b^{18, 65}_1 ∧  b^{18, 65}_0)
c  in CNF:
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨  b^{18, 65}_2
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_1
c     b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨  b^{18, 65}_0
c  in DIMACS:
 13364  13365  13366  1152  13367 0
 13364  13365  13366  1152 -13368 0
 13364  13365  13366  1152  13369 0

c  -1-1 --> -2
c    ( b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧  b^{18, 64}_0 ∧ -p_1152) -> ( b^{18, 65}_2 ∧  b^{18, 65}_1 ∧ -b^{18, 65}_0)
c  in CNF:
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨  b^{18, 65}_2
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨  b^{18, 65}_1
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨  p_1152 ∨ -b^{18, 65}_0
c  in DIMACS:
-13364  13365 -13366  1152  13367 0
-13364  13365 -13366  1152  13368 0
-13364  13365 -13366  1152 -13369 0

c  -2-1 --> break 
c    ( b^{18, 64}_2 ∧  b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨  b^{18, 64}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-13364 -13365  13366  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{18, 64}_2 ∧ -b^{18, 64}_1 ∧ -b^{18, 64}_0 ∧ true) 
c  in CNF:
c    -b^{18, 64}_2 ∨  b^{18, 64}_1 ∨  b^{18, 64}_0 ∨ false 
c  in DIMACS:
-13364  13365  13366  0

c  3 does not represent an automaton state.
c    -(-b^{18, 64}_2 ∧  b^{18, 64}_1 ∧  b^{18, 64}_0 ∧ true) 
c  in CNF:
c     b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ false 
c  in DIMACS:
 13364 -13365 -13366  0
c  -3 does not represent an automaton state.
c    -( b^{18, 64}_2 ∧  b^{18, 64}_1 ∧  b^{18, 64}_0 ∧ true) 
c  in CNF:
c    -b^{18, 64}_2 ∨ -b^{18, 64}_1 ∨ -b^{18, 64}_0 ∨ false 
c  in DIMACS:
-13364 -13365 -13366  0

c INIT for k = 19
c    -b^{19, 1}_2
c    -b^{19, 1}_1
c    -b^{19, 1}_0
c  in DIMACS:
-13370 0
-13371 0
-13372 0

c Transitions for k = 19
c i = 1
c  -2+1 --> -1
c    ( b^{19, 1}_2 ∧  b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧  p_19) -> ( b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0)
c  in CNF:
c    -b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨  b^{19, 2}_2
c    -b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_1
c    -b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨  b^{19, 2}_0
c  in DIMACS:
-13370 -13371  13372 -19  13373 0
-13370 -13371  13372 -19 -13374 0
-13370 -13371  13372 -19  13375 0

c  -1+1 --> 0
c    ( b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧  b^{19, 1}_0 ∧  p_19) -> (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧ -b^{19, 2}_0)
c  in CNF:
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_2
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_1
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_0
c  in DIMACS:
-13370  13371 -13372 -19 -13373 0
-13370  13371 -13372 -19 -13374 0
-13370  13371 -13372 -19 -13375 0

c  0+1 --> 1
c    (-b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧  p_19) -> (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0)
c  in CNF:
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_2
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_1
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨  b^{19, 2}_0
c  in DIMACS:
 13370  13371  13372 -19 -13373 0
 13370  13371  13372 -19 -13374 0
 13370  13371  13372 -19  13375 0

c  1+1 --> 2
c    (-b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧  b^{19, 1}_0 ∧  p_19) -> (-b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0)
c  in CNF:
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_2
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨  b^{19, 2}_1
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ -p_19 ∨ -b^{19, 2}_0
c  in DIMACS:
 13370  13371 -13372 -19 -13373 0
 13370  13371 -13372 -19  13374 0
 13370  13371 -13372 -19 -13375 0

c  2+1 --> break 
c    (-b^{19, 1}_2 ∧  b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧  p_19) -> break
c  in CNF:
c     b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ -p_19 ∨ break
c  in DIMACS:
 13370 -13371  13372 -19 1162 0


c  2-1 --> 1
c    (-b^{19, 1}_2 ∧  b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧ -p_19) -> (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0)
c  in CNF:
c     b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_2
c     b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_1
c     b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨  b^{19, 2}_0
c  in DIMACS:
 13370 -13371  13372  19 -13373 0
 13370 -13371  13372  19 -13374 0
 13370 -13371  13372  19  13375 0

c  1-1 --> 0
c    (-b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧  b^{19, 1}_0 ∧ -p_19) -> (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧ -b^{19, 2}_0)
c  in CNF:
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_2
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_1
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_0
c  in DIMACS:
 13370  13371 -13372  19 -13373 0
 13370  13371 -13372  19 -13374 0
 13370  13371 -13372  19 -13375 0

c  0-1 --> -1
c    (-b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧ -p_19) -> ( b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0)
c  in CNF:
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨  b^{19, 2}_2
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_1
c     b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨  b^{19, 2}_0
c  in DIMACS:
 13370  13371  13372  19  13373 0
 13370  13371  13372  19 -13374 0
 13370  13371  13372  19  13375 0

c  -1-1 --> -2
c    ( b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧  b^{19, 1}_0 ∧ -p_19) -> ( b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0)
c  in CNF:
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨  b^{19, 2}_2
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨  b^{19, 2}_1
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨  p_19 ∨ -b^{19, 2}_0
c  in DIMACS:
-13370  13371 -13372  19  13373 0
-13370  13371 -13372  19  13374 0
-13370  13371 -13372  19 -13375 0

c  -2-1 --> break 
c    ( b^{19, 1}_2 ∧  b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧ -p_19) -> break
c  in CNF:
c    -b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨  b^{19, 1}_0 ∨  p_19 ∨ break
c  in DIMACS:
-13370 -13371  13372  19 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 1}_2 ∧ -b^{19, 1}_1 ∧ -b^{19, 1}_0 ∧ true) 
c  in CNF:
c    -b^{19, 1}_2 ∨  b^{19, 1}_1 ∨  b^{19, 1}_0 ∨ false 
c  in DIMACS:
-13370  13371  13372  0

c  3 does not represent an automaton state.
c    -(-b^{19, 1}_2 ∧  b^{19, 1}_1 ∧  b^{19, 1}_0 ∧ true) 
c  in CNF:
c     b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ false 
c  in DIMACS:
 13370 -13371 -13372  0
c  -3 does not represent an automaton state.
c    -( b^{19, 1}_2 ∧  b^{19, 1}_1 ∧  b^{19, 1}_0 ∧ true) 
c  in CNF:
c    -b^{19, 1}_2 ∨ -b^{19, 1}_1 ∨ -b^{19, 1}_0 ∨ false 
c  in DIMACS:
-13370 -13371 -13372  0

c i = 2
c  -2+1 --> -1
c    ( b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧  p_38) -> ( b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0)
c  in CNF:
c    -b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨  b^{19, 3}_2
c    -b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_1
c    -b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨  b^{19, 3}_0
c  in DIMACS:
-13373 -13374  13375 -38  13376 0
-13373 -13374  13375 -38 -13377 0
-13373 -13374  13375 -38  13378 0

c  -1+1 --> 0
c    ( b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0 ∧  p_38) -> (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧ -b^{19, 3}_0)
c  in CNF:
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_2
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_1
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_0
c  in DIMACS:
-13373  13374 -13375 -38 -13376 0
-13373  13374 -13375 -38 -13377 0
-13373  13374 -13375 -38 -13378 0

c  0+1 --> 1
c    (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧  p_38) -> (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0)
c  in CNF:
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_2
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_1
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨  b^{19, 3}_0
c  in DIMACS:
 13373  13374  13375 -38 -13376 0
 13373  13374  13375 -38 -13377 0
 13373  13374  13375 -38  13378 0

c  1+1 --> 2
c    (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0 ∧  p_38) -> (-b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0)
c  in CNF:
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_2
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨  b^{19, 3}_1
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ -p_38 ∨ -b^{19, 3}_0
c  in DIMACS:
 13373  13374 -13375 -38 -13376 0
 13373  13374 -13375 -38  13377 0
 13373  13374 -13375 -38 -13378 0

c  2+1 --> break 
c    (-b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧  p_38) -> break
c  in CNF:
c     b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ -p_38 ∨ break
c  in DIMACS:
 13373 -13374  13375 -38 1162 0


c  2-1 --> 1
c    (-b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧ -p_38) -> (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0)
c  in CNF:
c     b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_2
c     b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_1
c     b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨  b^{19, 3}_0
c  in DIMACS:
 13373 -13374  13375  38 -13376 0
 13373 -13374  13375  38 -13377 0
 13373 -13374  13375  38  13378 0

c  1-1 --> 0
c    (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0 ∧ -p_38) -> (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧ -b^{19, 3}_0)
c  in CNF:
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_2
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_1
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_0
c  in DIMACS:
 13373  13374 -13375  38 -13376 0
 13373  13374 -13375  38 -13377 0
 13373  13374 -13375  38 -13378 0

c  0-1 --> -1
c    (-b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧ -p_38) -> ( b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0)
c  in CNF:
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨  b^{19, 3}_2
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_1
c     b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨  b^{19, 3}_0
c  in DIMACS:
 13373  13374  13375  38  13376 0
 13373  13374  13375  38 -13377 0
 13373  13374  13375  38  13378 0

c  -1-1 --> -2
c    ( b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧  b^{19, 2}_0 ∧ -p_38) -> ( b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0)
c  in CNF:
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨  b^{19, 3}_2
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨  b^{19, 3}_1
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨  p_38 ∨ -b^{19, 3}_0
c  in DIMACS:
-13373  13374 -13375  38  13376 0
-13373  13374 -13375  38  13377 0
-13373  13374 -13375  38 -13378 0

c  -2-1 --> break 
c    ( b^{19, 2}_2 ∧  b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧ -p_38) -> break
c  in CNF:
c    -b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨  b^{19, 2}_0 ∨  p_38 ∨ break
c  in DIMACS:
-13373 -13374  13375  38 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 2}_2 ∧ -b^{19, 2}_1 ∧ -b^{19, 2}_0 ∧ true) 
c  in CNF:
c    -b^{19, 2}_2 ∨  b^{19, 2}_1 ∨  b^{19, 2}_0 ∨ false 
c  in DIMACS:
-13373  13374  13375  0

c  3 does not represent an automaton state.
c    -(-b^{19, 2}_2 ∧  b^{19, 2}_1 ∧  b^{19, 2}_0 ∧ true) 
c  in CNF:
c     b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ false 
c  in DIMACS:
 13373 -13374 -13375  0
c  -3 does not represent an automaton state.
c    -( b^{19, 2}_2 ∧  b^{19, 2}_1 ∧  b^{19, 2}_0 ∧ true) 
c  in CNF:
c    -b^{19, 2}_2 ∨ -b^{19, 2}_1 ∨ -b^{19, 2}_0 ∨ false 
c  in DIMACS:
-13373 -13374 -13375  0

c i = 3
c  -2+1 --> -1
c    ( b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧  p_57) -> ( b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0)
c  in CNF:
c    -b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨  b^{19, 4}_2
c    -b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_1
c    -b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨  b^{19, 4}_0
c  in DIMACS:
-13376 -13377  13378 -57  13379 0
-13376 -13377  13378 -57 -13380 0
-13376 -13377  13378 -57  13381 0

c  -1+1 --> 0
c    ( b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0 ∧  p_57) -> (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧ -b^{19, 4}_0)
c  in CNF:
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_2
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_1
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_0
c  in DIMACS:
-13376  13377 -13378 -57 -13379 0
-13376  13377 -13378 -57 -13380 0
-13376  13377 -13378 -57 -13381 0

c  0+1 --> 1
c    (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧  p_57) -> (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0)
c  in CNF:
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_2
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_1
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨  b^{19, 4}_0
c  in DIMACS:
 13376  13377  13378 -57 -13379 0
 13376  13377  13378 -57 -13380 0
 13376  13377  13378 -57  13381 0

c  1+1 --> 2
c    (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0 ∧  p_57) -> (-b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0)
c  in CNF:
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_2
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨  b^{19, 4}_1
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ -p_57 ∨ -b^{19, 4}_0
c  in DIMACS:
 13376  13377 -13378 -57 -13379 0
 13376  13377 -13378 -57  13380 0
 13376  13377 -13378 -57 -13381 0

c  2+1 --> break 
c    (-b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧  p_57) -> break
c  in CNF:
c     b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ -p_57 ∨ break
c  in DIMACS:
 13376 -13377  13378 -57 1162 0


c  2-1 --> 1
c    (-b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧ -p_57) -> (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0)
c  in CNF:
c     b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_2
c     b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_1
c     b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨  b^{19, 4}_0
c  in DIMACS:
 13376 -13377  13378  57 -13379 0
 13376 -13377  13378  57 -13380 0
 13376 -13377  13378  57  13381 0

c  1-1 --> 0
c    (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0 ∧ -p_57) -> (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧ -b^{19, 4}_0)
c  in CNF:
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_2
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_1
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_0
c  in DIMACS:
 13376  13377 -13378  57 -13379 0
 13376  13377 -13378  57 -13380 0
 13376  13377 -13378  57 -13381 0

c  0-1 --> -1
c    (-b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧ -p_57) -> ( b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0)
c  in CNF:
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨  b^{19, 4}_2
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_1
c     b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨  b^{19, 4}_0
c  in DIMACS:
 13376  13377  13378  57  13379 0
 13376  13377  13378  57 -13380 0
 13376  13377  13378  57  13381 0

c  -1-1 --> -2
c    ( b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧  b^{19, 3}_0 ∧ -p_57) -> ( b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0)
c  in CNF:
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨  b^{19, 4}_2
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨  b^{19, 4}_1
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨  p_57 ∨ -b^{19, 4}_0
c  in DIMACS:
-13376  13377 -13378  57  13379 0
-13376  13377 -13378  57  13380 0
-13376  13377 -13378  57 -13381 0

c  -2-1 --> break 
c    ( b^{19, 3}_2 ∧  b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧ -p_57) -> break
c  in CNF:
c    -b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨  b^{19, 3}_0 ∨  p_57 ∨ break
c  in DIMACS:
-13376 -13377  13378  57 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 3}_2 ∧ -b^{19, 3}_1 ∧ -b^{19, 3}_0 ∧ true) 
c  in CNF:
c    -b^{19, 3}_2 ∨  b^{19, 3}_1 ∨  b^{19, 3}_0 ∨ false 
c  in DIMACS:
-13376  13377  13378  0

c  3 does not represent an automaton state.
c    -(-b^{19, 3}_2 ∧  b^{19, 3}_1 ∧  b^{19, 3}_0 ∧ true) 
c  in CNF:
c     b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ false 
c  in DIMACS:
 13376 -13377 -13378  0
c  -3 does not represent an automaton state.
c    -( b^{19, 3}_2 ∧  b^{19, 3}_1 ∧  b^{19, 3}_0 ∧ true) 
c  in CNF:
c    -b^{19, 3}_2 ∨ -b^{19, 3}_1 ∨ -b^{19, 3}_0 ∨ false 
c  in DIMACS:
-13376 -13377 -13378  0

c i = 4
c  -2+1 --> -1
c    ( b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧  p_76) -> ( b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0)
c  in CNF:
c    -b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨  b^{19, 5}_2
c    -b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_1
c    -b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨  b^{19, 5}_0
c  in DIMACS:
-13379 -13380  13381 -76  13382 0
-13379 -13380  13381 -76 -13383 0
-13379 -13380  13381 -76  13384 0

c  -1+1 --> 0
c    ( b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0 ∧  p_76) -> (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧ -b^{19, 5}_0)
c  in CNF:
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_2
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_1
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_0
c  in DIMACS:
-13379  13380 -13381 -76 -13382 0
-13379  13380 -13381 -76 -13383 0
-13379  13380 -13381 -76 -13384 0

c  0+1 --> 1
c    (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧  p_76) -> (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0)
c  in CNF:
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_2
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_1
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨  b^{19, 5}_0
c  in DIMACS:
 13379  13380  13381 -76 -13382 0
 13379  13380  13381 -76 -13383 0
 13379  13380  13381 -76  13384 0

c  1+1 --> 2
c    (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0 ∧  p_76) -> (-b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0)
c  in CNF:
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_2
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨  b^{19, 5}_1
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ -p_76 ∨ -b^{19, 5}_0
c  in DIMACS:
 13379  13380 -13381 -76 -13382 0
 13379  13380 -13381 -76  13383 0
 13379  13380 -13381 -76 -13384 0

c  2+1 --> break 
c    (-b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧  p_76) -> break
c  in CNF:
c     b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 13379 -13380  13381 -76 1162 0


c  2-1 --> 1
c    (-b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧ -p_76) -> (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0)
c  in CNF:
c     b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_2
c     b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_1
c     b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨  b^{19, 5}_0
c  in DIMACS:
 13379 -13380  13381  76 -13382 0
 13379 -13380  13381  76 -13383 0
 13379 -13380  13381  76  13384 0

c  1-1 --> 0
c    (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0 ∧ -p_76) -> (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧ -b^{19, 5}_0)
c  in CNF:
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_2
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_1
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_0
c  in DIMACS:
 13379  13380 -13381  76 -13382 0
 13379  13380 -13381  76 -13383 0
 13379  13380 -13381  76 -13384 0

c  0-1 --> -1
c    (-b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧ -p_76) -> ( b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0)
c  in CNF:
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨  b^{19, 5}_2
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_1
c     b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨  b^{19, 5}_0
c  in DIMACS:
 13379  13380  13381  76  13382 0
 13379  13380  13381  76 -13383 0
 13379  13380  13381  76  13384 0

c  -1-1 --> -2
c    ( b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧  b^{19, 4}_0 ∧ -p_76) -> ( b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0)
c  in CNF:
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨  b^{19, 5}_2
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨  b^{19, 5}_1
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨  p_76 ∨ -b^{19, 5}_0
c  in DIMACS:
-13379  13380 -13381  76  13382 0
-13379  13380 -13381  76  13383 0
-13379  13380 -13381  76 -13384 0

c  -2-1 --> break 
c    ( b^{19, 4}_2 ∧  b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨  b^{19, 4}_0 ∨  p_76 ∨ break
c  in DIMACS:
-13379 -13380  13381  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 4}_2 ∧ -b^{19, 4}_1 ∧ -b^{19, 4}_0 ∧ true) 
c  in CNF:
c    -b^{19, 4}_2 ∨  b^{19, 4}_1 ∨  b^{19, 4}_0 ∨ false 
c  in DIMACS:
-13379  13380  13381  0

c  3 does not represent an automaton state.
c    -(-b^{19, 4}_2 ∧  b^{19, 4}_1 ∧  b^{19, 4}_0 ∧ true) 
c  in CNF:
c     b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ false 
c  in DIMACS:
 13379 -13380 -13381  0
c  -3 does not represent an automaton state.
c    -( b^{19, 4}_2 ∧  b^{19, 4}_1 ∧  b^{19, 4}_0 ∧ true) 
c  in CNF:
c    -b^{19, 4}_2 ∨ -b^{19, 4}_1 ∨ -b^{19, 4}_0 ∨ false 
c  in DIMACS:
-13379 -13380 -13381  0

c i = 5
c  -2+1 --> -1
c    ( b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧  p_95) -> ( b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0)
c  in CNF:
c    -b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨  b^{19, 6}_2
c    -b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_1
c    -b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨  b^{19, 6}_0
c  in DIMACS:
-13382 -13383  13384 -95  13385 0
-13382 -13383  13384 -95 -13386 0
-13382 -13383  13384 -95  13387 0

c  -1+1 --> 0
c    ( b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0 ∧  p_95) -> (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧ -b^{19, 6}_0)
c  in CNF:
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_2
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_1
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_0
c  in DIMACS:
-13382  13383 -13384 -95 -13385 0
-13382  13383 -13384 -95 -13386 0
-13382  13383 -13384 -95 -13387 0

c  0+1 --> 1
c    (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧  p_95) -> (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0)
c  in CNF:
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_2
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_1
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨  b^{19, 6}_0
c  in DIMACS:
 13382  13383  13384 -95 -13385 0
 13382  13383  13384 -95 -13386 0
 13382  13383  13384 -95  13387 0

c  1+1 --> 2
c    (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0 ∧  p_95) -> (-b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0)
c  in CNF:
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_2
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨  b^{19, 6}_1
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ -p_95 ∨ -b^{19, 6}_0
c  in DIMACS:
 13382  13383 -13384 -95 -13385 0
 13382  13383 -13384 -95  13386 0
 13382  13383 -13384 -95 -13387 0

c  2+1 --> break 
c    (-b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧  p_95) -> break
c  in CNF:
c     b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ -p_95 ∨ break
c  in DIMACS:
 13382 -13383  13384 -95 1162 0


c  2-1 --> 1
c    (-b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧ -p_95) -> (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0)
c  in CNF:
c     b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_2
c     b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_1
c     b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨  b^{19, 6}_0
c  in DIMACS:
 13382 -13383  13384  95 -13385 0
 13382 -13383  13384  95 -13386 0
 13382 -13383  13384  95  13387 0

c  1-1 --> 0
c    (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0 ∧ -p_95) -> (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧ -b^{19, 6}_0)
c  in CNF:
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_2
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_1
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_0
c  in DIMACS:
 13382  13383 -13384  95 -13385 0
 13382  13383 -13384  95 -13386 0
 13382  13383 -13384  95 -13387 0

c  0-1 --> -1
c    (-b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧ -p_95) -> ( b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0)
c  in CNF:
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨  b^{19, 6}_2
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_1
c     b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨  b^{19, 6}_0
c  in DIMACS:
 13382  13383  13384  95  13385 0
 13382  13383  13384  95 -13386 0
 13382  13383  13384  95  13387 0

c  -1-1 --> -2
c    ( b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧  b^{19, 5}_0 ∧ -p_95) -> ( b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0)
c  in CNF:
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨  b^{19, 6}_2
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨  b^{19, 6}_1
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨  p_95 ∨ -b^{19, 6}_0
c  in DIMACS:
-13382  13383 -13384  95  13385 0
-13382  13383 -13384  95  13386 0
-13382  13383 -13384  95 -13387 0

c  -2-1 --> break 
c    ( b^{19, 5}_2 ∧  b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧ -p_95) -> break
c  in CNF:
c    -b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨  b^{19, 5}_0 ∨  p_95 ∨ break
c  in DIMACS:
-13382 -13383  13384  95 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 5}_2 ∧ -b^{19, 5}_1 ∧ -b^{19, 5}_0 ∧ true) 
c  in CNF:
c    -b^{19, 5}_2 ∨  b^{19, 5}_1 ∨  b^{19, 5}_0 ∨ false 
c  in DIMACS:
-13382  13383  13384  0

c  3 does not represent an automaton state.
c    -(-b^{19, 5}_2 ∧  b^{19, 5}_1 ∧  b^{19, 5}_0 ∧ true) 
c  in CNF:
c     b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ false 
c  in DIMACS:
 13382 -13383 -13384  0
c  -3 does not represent an automaton state.
c    -( b^{19, 5}_2 ∧  b^{19, 5}_1 ∧  b^{19, 5}_0 ∧ true) 
c  in CNF:
c    -b^{19, 5}_2 ∨ -b^{19, 5}_1 ∨ -b^{19, 5}_0 ∨ false 
c  in DIMACS:
-13382 -13383 -13384  0

c i = 6
c  -2+1 --> -1
c    ( b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧  p_114) -> ( b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0)
c  in CNF:
c    -b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨  b^{19, 7}_2
c    -b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_1
c    -b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨  b^{19, 7}_0
c  in DIMACS:
-13385 -13386  13387 -114  13388 0
-13385 -13386  13387 -114 -13389 0
-13385 -13386  13387 -114  13390 0

c  -1+1 --> 0
c    ( b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0 ∧  p_114) -> (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧ -b^{19, 7}_0)
c  in CNF:
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_2
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_1
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_0
c  in DIMACS:
-13385  13386 -13387 -114 -13388 0
-13385  13386 -13387 -114 -13389 0
-13385  13386 -13387 -114 -13390 0

c  0+1 --> 1
c    (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧  p_114) -> (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0)
c  in CNF:
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_2
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_1
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨  b^{19, 7}_0
c  in DIMACS:
 13385  13386  13387 -114 -13388 0
 13385  13386  13387 -114 -13389 0
 13385  13386  13387 -114  13390 0

c  1+1 --> 2
c    (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0 ∧  p_114) -> (-b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0)
c  in CNF:
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_2
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨  b^{19, 7}_1
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ -p_114 ∨ -b^{19, 7}_0
c  in DIMACS:
 13385  13386 -13387 -114 -13388 0
 13385  13386 -13387 -114  13389 0
 13385  13386 -13387 -114 -13390 0

c  2+1 --> break 
c    (-b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧  p_114) -> break
c  in CNF:
c     b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 13385 -13386  13387 -114 1162 0


c  2-1 --> 1
c    (-b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧ -p_114) -> (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0)
c  in CNF:
c     b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_2
c     b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_1
c     b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨  b^{19, 7}_0
c  in DIMACS:
 13385 -13386  13387  114 -13388 0
 13385 -13386  13387  114 -13389 0
 13385 -13386  13387  114  13390 0

c  1-1 --> 0
c    (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0 ∧ -p_114) -> (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧ -b^{19, 7}_0)
c  in CNF:
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_2
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_1
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_0
c  in DIMACS:
 13385  13386 -13387  114 -13388 0
 13385  13386 -13387  114 -13389 0
 13385  13386 -13387  114 -13390 0

c  0-1 --> -1
c    (-b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧ -p_114) -> ( b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0)
c  in CNF:
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨  b^{19, 7}_2
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_1
c     b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨  b^{19, 7}_0
c  in DIMACS:
 13385  13386  13387  114  13388 0
 13385  13386  13387  114 -13389 0
 13385  13386  13387  114  13390 0

c  -1-1 --> -2
c    ( b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧  b^{19, 6}_0 ∧ -p_114) -> ( b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0)
c  in CNF:
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨  b^{19, 7}_2
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨  b^{19, 7}_1
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨  p_114 ∨ -b^{19, 7}_0
c  in DIMACS:
-13385  13386 -13387  114  13388 0
-13385  13386 -13387  114  13389 0
-13385  13386 -13387  114 -13390 0

c  -2-1 --> break 
c    ( b^{19, 6}_2 ∧  b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨  b^{19, 6}_0 ∨  p_114 ∨ break
c  in DIMACS:
-13385 -13386  13387  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 6}_2 ∧ -b^{19, 6}_1 ∧ -b^{19, 6}_0 ∧ true) 
c  in CNF:
c    -b^{19, 6}_2 ∨  b^{19, 6}_1 ∨  b^{19, 6}_0 ∨ false 
c  in DIMACS:
-13385  13386  13387  0

c  3 does not represent an automaton state.
c    -(-b^{19, 6}_2 ∧  b^{19, 6}_1 ∧  b^{19, 6}_0 ∧ true) 
c  in CNF:
c     b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ false 
c  in DIMACS:
 13385 -13386 -13387  0
c  -3 does not represent an automaton state.
c    -( b^{19, 6}_2 ∧  b^{19, 6}_1 ∧  b^{19, 6}_0 ∧ true) 
c  in CNF:
c    -b^{19, 6}_2 ∨ -b^{19, 6}_1 ∨ -b^{19, 6}_0 ∨ false 
c  in DIMACS:
-13385 -13386 -13387  0

c i = 7
c  -2+1 --> -1
c    ( b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧  p_133) -> ( b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0)
c  in CNF:
c    -b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨  b^{19, 8}_2
c    -b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_1
c    -b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨  b^{19, 8}_0
c  in DIMACS:
-13388 -13389  13390 -133  13391 0
-13388 -13389  13390 -133 -13392 0
-13388 -13389  13390 -133  13393 0

c  -1+1 --> 0
c    ( b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0 ∧  p_133) -> (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧ -b^{19, 8}_0)
c  in CNF:
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_2
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_1
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_0
c  in DIMACS:
-13388  13389 -13390 -133 -13391 0
-13388  13389 -13390 -133 -13392 0
-13388  13389 -13390 -133 -13393 0

c  0+1 --> 1
c    (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧  p_133) -> (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0)
c  in CNF:
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_2
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_1
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨  b^{19, 8}_0
c  in DIMACS:
 13388  13389  13390 -133 -13391 0
 13388  13389  13390 -133 -13392 0
 13388  13389  13390 -133  13393 0

c  1+1 --> 2
c    (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0 ∧  p_133) -> (-b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0)
c  in CNF:
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_2
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨  b^{19, 8}_1
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ -p_133 ∨ -b^{19, 8}_0
c  in DIMACS:
 13388  13389 -13390 -133 -13391 0
 13388  13389 -13390 -133  13392 0
 13388  13389 -13390 -133 -13393 0

c  2+1 --> break 
c    (-b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧  p_133) -> break
c  in CNF:
c     b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ -p_133 ∨ break
c  in DIMACS:
 13388 -13389  13390 -133 1162 0


c  2-1 --> 1
c    (-b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧ -p_133) -> (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0)
c  in CNF:
c     b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_2
c     b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_1
c     b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨  b^{19, 8}_0
c  in DIMACS:
 13388 -13389  13390  133 -13391 0
 13388 -13389  13390  133 -13392 0
 13388 -13389  13390  133  13393 0

c  1-1 --> 0
c    (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0 ∧ -p_133) -> (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧ -b^{19, 8}_0)
c  in CNF:
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_2
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_1
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_0
c  in DIMACS:
 13388  13389 -13390  133 -13391 0
 13388  13389 -13390  133 -13392 0
 13388  13389 -13390  133 -13393 0

c  0-1 --> -1
c    (-b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧ -p_133) -> ( b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0)
c  in CNF:
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨  b^{19, 8}_2
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_1
c     b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨  b^{19, 8}_0
c  in DIMACS:
 13388  13389  13390  133  13391 0
 13388  13389  13390  133 -13392 0
 13388  13389  13390  133  13393 0

c  -1-1 --> -2
c    ( b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧  b^{19, 7}_0 ∧ -p_133) -> ( b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0)
c  in CNF:
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨  b^{19, 8}_2
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨  b^{19, 8}_1
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨  p_133 ∨ -b^{19, 8}_0
c  in DIMACS:
-13388  13389 -13390  133  13391 0
-13388  13389 -13390  133  13392 0
-13388  13389 -13390  133 -13393 0

c  -2-1 --> break 
c    ( b^{19, 7}_2 ∧  b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧ -p_133) -> break
c  in CNF:
c    -b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨  b^{19, 7}_0 ∨  p_133 ∨ break
c  in DIMACS:
-13388 -13389  13390  133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 7}_2 ∧ -b^{19, 7}_1 ∧ -b^{19, 7}_0 ∧ true) 
c  in CNF:
c    -b^{19, 7}_2 ∨  b^{19, 7}_1 ∨  b^{19, 7}_0 ∨ false 
c  in DIMACS:
-13388  13389  13390  0

c  3 does not represent an automaton state.
c    -(-b^{19, 7}_2 ∧  b^{19, 7}_1 ∧  b^{19, 7}_0 ∧ true) 
c  in CNF:
c     b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ false 
c  in DIMACS:
 13388 -13389 -13390  0
c  -3 does not represent an automaton state.
c    -( b^{19, 7}_2 ∧  b^{19, 7}_1 ∧  b^{19, 7}_0 ∧ true) 
c  in CNF:
c    -b^{19, 7}_2 ∨ -b^{19, 7}_1 ∨ -b^{19, 7}_0 ∨ false 
c  in DIMACS:
-13388 -13389 -13390  0

c i = 8
c  -2+1 --> -1
c    ( b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧  p_152) -> ( b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0)
c  in CNF:
c    -b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨  b^{19, 9}_2
c    -b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_1
c    -b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨  b^{19, 9}_0
c  in DIMACS:
-13391 -13392  13393 -152  13394 0
-13391 -13392  13393 -152 -13395 0
-13391 -13392  13393 -152  13396 0

c  -1+1 --> 0
c    ( b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0 ∧  p_152) -> (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧ -b^{19, 9}_0)
c  in CNF:
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_2
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_1
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_0
c  in DIMACS:
-13391  13392 -13393 -152 -13394 0
-13391  13392 -13393 -152 -13395 0
-13391  13392 -13393 -152 -13396 0

c  0+1 --> 1
c    (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧  p_152) -> (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0)
c  in CNF:
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_2
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_1
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨  b^{19, 9}_0
c  in DIMACS:
 13391  13392  13393 -152 -13394 0
 13391  13392  13393 -152 -13395 0
 13391  13392  13393 -152  13396 0

c  1+1 --> 2
c    (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0 ∧  p_152) -> (-b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0)
c  in CNF:
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_2
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨  b^{19, 9}_1
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ -p_152 ∨ -b^{19, 9}_0
c  in DIMACS:
 13391  13392 -13393 -152 -13394 0
 13391  13392 -13393 -152  13395 0
 13391  13392 -13393 -152 -13396 0

c  2+1 --> break 
c    (-b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧  p_152) -> break
c  in CNF:
c     b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 13391 -13392  13393 -152 1162 0


c  2-1 --> 1
c    (-b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧ -p_152) -> (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0)
c  in CNF:
c     b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_2
c     b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_1
c     b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨  b^{19, 9}_0
c  in DIMACS:
 13391 -13392  13393  152 -13394 0
 13391 -13392  13393  152 -13395 0
 13391 -13392  13393  152  13396 0

c  1-1 --> 0
c    (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0 ∧ -p_152) -> (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧ -b^{19, 9}_0)
c  in CNF:
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_2
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_1
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_0
c  in DIMACS:
 13391  13392 -13393  152 -13394 0
 13391  13392 -13393  152 -13395 0
 13391  13392 -13393  152 -13396 0

c  0-1 --> -1
c    (-b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧ -p_152) -> ( b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0)
c  in CNF:
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨  b^{19, 9}_2
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_1
c     b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨  b^{19, 9}_0
c  in DIMACS:
 13391  13392  13393  152  13394 0
 13391  13392  13393  152 -13395 0
 13391  13392  13393  152  13396 0

c  -1-1 --> -2
c    ( b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧  b^{19, 8}_0 ∧ -p_152) -> ( b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0)
c  in CNF:
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨  b^{19, 9}_2
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨  b^{19, 9}_1
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨  p_152 ∨ -b^{19, 9}_0
c  in DIMACS:
-13391  13392 -13393  152  13394 0
-13391  13392 -13393  152  13395 0
-13391  13392 -13393  152 -13396 0

c  -2-1 --> break 
c    ( b^{19, 8}_2 ∧  b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨  b^{19, 8}_0 ∨  p_152 ∨ break
c  in DIMACS:
-13391 -13392  13393  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 8}_2 ∧ -b^{19, 8}_1 ∧ -b^{19, 8}_0 ∧ true) 
c  in CNF:
c    -b^{19, 8}_2 ∨  b^{19, 8}_1 ∨  b^{19, 8}_0 ∨ false 
c  in DIMACS:
-13391  13392  13393  0

c  3 does not represent an automaton state.
c    -(-b^{19, 8}_2 ∧  b^{19, 8}_1 ∧  b^{19, 8}_0 ∧ true) 
c  in CNF:
c     b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ false 
c  in DIMACS:
 13391 -13392 -13393  0
c  -3 does not represent an automaton state.
c    -( b^{19, 8}_2 ∧  b^{19, 8}_1 ∧  b^{19, 8}_0 ∧ true) 
c  in CNF:
c    -b^{19, 8}_2 ∨ -b^{19, 8}_1 ∨ -b^{19, 8}_0 ∨ false 
c  in DIMACS:
-13391 -13392 -13393  0

c i = 9
c  -2+1 --> -1
c    ( b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧  p_171) -> ( b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0)
c  in CNF:
c    -b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨  b^{19, 10}_2
c    -b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_1
c    -b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨  b^{19, 10}_0
c  in DIMACS:
-13394 -13395  13396 -171  13397 0
-13394 -13395  13396 -171 -13398 0
-13394 -13395  13396 -171  13399 0

c  -1+1 --> 0
c    ( b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0 ∧  p_171) -> (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧ -b^{19, 10}_0)
c  in CNF:
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_2
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_1
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_0
c  in DIMACS:
-13394  13395 -13396 -171 -13397 0
-13394  13395 -13396 -171 -13398 0
-13394  13395 -13396 -171 -13399 0

c  0+1 --> 1
c    (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧  p_171) -> (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0)
c  in CNF:
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_2
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_1
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨  b^{19, 10}_0
c  in DIMACS:
 13394  13395  13396 -171 -13397 0
 13394  13395  13396 -171 -13398 0
 13394  13395  13396 -171  13399 0

c  1+1 --> 2
c    (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0 ∧  p_171) -> (-b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0)
c  in CNF:
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_2
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨  b^{19, 10}_1
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ -p_171 ∨ -b^{19, 10}_0
c  in DIMACS:
 13394  13395 -13396 -171 -13397 0
 13394  13395 -13396 -171  13398 0
 13394  13395 -13396 -171 -13399 0

c  2+1 --> break 
c    (-b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧  p_171) -> break
c  in CNF:
c     b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 13394 -13395  13396 -171 1162 0


c  2-1 --> 1
c    (-b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧ -p_171) -> (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0)
c  in CNF:
c     b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_2
c     b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_1
c     b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨  b^{19, 10}_0
c  in DIMACS:
 13394 -13395  13396  171 -13397 0
 13394 -13395  13396  171 -13398 0
 13394 -13395  13396  171  13399 0

c  1-1 --> 0
c    (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0 ∧ -p_171) -> (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧ -b^{19, 10}_0)
c  in CNF:
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_2
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_1
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_0
c  in DIMACS:
 13394  13395 -13396  171 -13397 0
 13394  13395 -13396  171 -13398 0
 13394  13395 -13396  171 -13399 0

c  0-1 --> -1
c    (-b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧ -p_171) -> ( b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0)
c  in CNF:
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨  b^{19, 10}_2
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_1
c     b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨  b^{19, 10}_0
c  in DIMACS:
 13394  13395  13396  171  13397 0
 13394  13395  13396  171 -13398 0
 13394  13395  13396  171  13399 0

c  -1-1 --> -2
c    ( b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧  b^{19, 9}_0 ∧ -p_171) -> ( b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0)
c  in CNF:
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨  b^{19, 10}_2
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨  b^{19, 10}_1
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨  p_171 ∨ -b^{19, 10}_0
c  in DIMACS:
-13394  13395 -13396  171  13397 0
-13394  13395 -13396  171  13398 0
-13394  13395 -13396  171 -13399 0

c  -2-1 --> break 
c    ( b^{19, 9}_2 ∧  b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨  b^{19, 9}_0 ∨  p_171 ∨ break
c  in DIMACS:
-13394 -13395  13396  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 9}_2 ∧ -b^{19, 9}_1 ∧ -b^{19, 9}_0 ∧ true) 
c  in CNF:
c    -b^{19, 9}_2 ∨  b^{19, 9}_1 ∨  b^{19, 9}_0 ∨ false 
c  in DIMACS:
-13394  13395  13396  0

c  3 does not represent an automaton state.
c    -(-b^{19, 9}_2 ∧  b^{19, 9}_1 ∧  b^{19, 9}_0 ∧ true) 
c  in CNF:
c     b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ false 
c  in DIMACS:
 13394 -13395 -13396  0
c  -3 does not represent an automaton state.
c    -( b^{19, 9}_2 ∧  b^{19, 9}_1 ∧  b^{19, 9}_0 ∧ true) 
c  in CNF:
c    -b^{19, 9}_2 ∨ -b^{19, 9}_1 ∨ -b^{19, 9}_0 ∨ false 
c  in DIMACS:
-13394 -13395 -13396  0

c i = 10
c  -2+1 --> -1
c    ( b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧  p_190) -> ( b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0)
c  in CNF:
c    -b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨  b^{19, 11}_2
c    -b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_1
c    -b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨  b^{19, 11}_0
c  in DIMACS:
-13397 -13398  13399 -190  13400 0
-13397 -13398  13399 -190 -13401 0
-13397 -13398  13399 -190  13402 0

c  -1+1 --> 0
c    ( b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0 ∧  p_190) -> (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧ -b^{19, 11}_0)
c  in CNF:
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_2
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_1
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_0
c  in DIMACS:
-13397  13398 -13399 -190 -13400 0
-13397  13398 -13399 -190 -13401 0
-13397  13398 -13399 -190 -13402 0

c  0+1 --> 1
c    (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧  p_190) -> (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0)
c  in CNF:
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_2
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_1
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨  b^{19, 11}_0
c  in DIMACS:
 13397  13398  13399 -190 -13400 0
 13397  13398  13399 -190 -13401 0
 13397  13398  13399 -190  13402 0

c  1+1 --> 2
c    (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0 ∧  p_190) -> (-b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0)
c  in CNF:
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_2
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨  b^{19, 11}_1
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ -p_190 ∨ -b^{19, 11}_0
c  in DIMACS:
 13397  13398 -13399 -190 -13400 0
 13397  13398 -13399 -190  13401 0
 13397  13398 -13399 -190 -13402 0

c  2+1 --> break 
c    (-b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧  p_190) -> break
c  in CNF:
c     b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 13397 -13398  13399 -190 1162 0


c  2-1 --> 1
c    (-b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧ -p_190) -> (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0)
c  in CNF:
c     b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_2
c     b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_1
c     b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨  b^{19, 11}_0
c  in DIMACS:
 13397 -13398  13399  190 -13400 0
 13397 -13398  13399  190 -13401 0
 13397 -13398  13399  190  13402 0

c  1-1 --> 0
c    (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0 ∧ -p_190) -> (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧ -b^{19, 11}_0)
c  in CNF:
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_2
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_1
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_0
c  in DIMACS:
 13397  13398 -13399  190 -13400 0
 13397  13398 -13399  190 -13401 0
 13397  13398 -13399  190 -13402 0

c  0-1 --> -1
c    (-b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧ -p_190) -> ( b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0)
c  in CNF:
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨  b^{19, 11}_2
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_1
c     b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨  b^{19, 11}_0
c  in DIMACS:
 13397  13398  13399  190  13400 0
 13397  13398  13399  190 -13401 0
 13397  13398  13399  190  13402 0

c  -1-1 --> -2
c    ( b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧  b^{19, 10}_0 ∧ -p_190) -> ( b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0)
c  in CNF:
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨  b^{19, 11}_2
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨  b^{19, 11}_1
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨  p_190 ∨ -b^{19, 11}_0
c  in DIMACS:
-13397  13398 -13399  190  13400 0
-13397  13398 -13399  190  13401 0
-13397  13398 -13399  190 -13402 0

c  -2-1 --> break 
c    ( b^{19, 10}_2 ∧  b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨  b^{19, 10}_0 ∨  p_190 ∨ break
c  in DIMACS:
-13397 -13398  13399  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 10}_2 ∧ -b^{19, 10}_1 ∧ -b^{19, 10}_0 ∧ true) 
c  in CNF:
c    -b^{19, 10}_2 ∨  b^{19, 10}_1 ∨  b^{19, 10}_0 ∨ false 
c  in DIMACS:
-13397  13398  13399  0

c  3 does not represent an automaton state.
c    -(-b^{19, 10}_2 ∧  b^{19, 10}_1 ∧  b^{19, 10}_0 ∧ true) 
c  in CNF:
c     b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ false 
c  in DIMACS:
 13397 -13398 -13399  0
c  -3 does not represent an automaton state.
c    -( b^{19, 10}_2 ∧  b^{19, 10}_1 ∧  b^{19, 10}_0 ∧ true) 
c  in CNF:
c    -b^{19, 10}_2 ∨ -b^{19, 10}_1 ∨ -b^{19, 10}_0 ∨ false 
c  in DIMACS:
-13397 -13398 -13399  0

c i = 11
c  -2+1 --> -1
c    ( b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧  p_209) -> ( b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0)
c  in CNF:
c    -b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨  b^{19, 12}_2
c    -b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_1
c    -b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨  b^{19, 12}_0
c  in DIMACS:
-13400 -13401  13402 -209  13403 0
-13400 -13401  13402 -209 -13404 0
-13400 -13401  13402 -209  13405 0

c  -1+1 --> 0
c    ( b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0 ∧  p_209) -> (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧ -b^{19, 12}_0)
c  in CNF:
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_2
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_1
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_0
c  in DIMACS:
-13400  13401 -13402 -209 -13403 0
-13400  13401 -13402 -209 -13404 0
-13400  13401 -13402 -209 -13405 0

c  0+1 --> 1
c    (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧  p_209) -> (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0)
c  in CNF:
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_2
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_1
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨  b^{19, 12}_0
c  in DIMACS:
 13400  13401  13402 -209 -13403 0
 13400  13401  13402 -209 -13404 0
 13400  13401  13402 -209  13405 0

c  1+1 --> 2
c    (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0 ∧  p_209) -> (-b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0)
c  in CNF:
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_2
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨  b^{19, 12}_1
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ -p_209 ∨ -b^{19, 12}_0
c  in DIMACS:
 13400  13401 -13402 -209 -13403 0
 13400  13401 -13402 -209  13404 0
 13400  13401 -13402 -209 -13405 0

c  2+1 --> break 
c    (-b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧  p_209) -> break
c  in CNF:
c     b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ -p_209 ∨ break
c  in DIMACS:
 13400 -13401  13402 -209 1162 0


c  2-1 --> 1
c    (-b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧ -p_209) -> (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0)
c  in CNF:
c     b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_2
c     b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_1
c     b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨  b^{19, 12}_0
c  in DIMACS:
 13400 -13401  13402  209 -13403 0
 13400 -13401  13402  209 -13404 0
 13400 -13401  13402  209  13405 0

c  1-1 --> 0
c    (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0 ∧ -p_209) -> (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧ -b^{19, 12}_0)
c  in CNF:
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_2
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_1
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_0
c  in DIMACS:
 13400  13401 -13402  209 -13403 0
 13400  13401 -13402  209 -13404 0
 13400  13401 -13402  209 -13405 0

c  0-1 --> -1
c    (-b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧ -p_209) -> ( b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0)
c  in CNF:
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨  b^{19, 12}_2
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_1
c     b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨  b^{19, 12}_0
c  in DIMACS:
 13400  13401  13402  209  13403 0
 13400  13401  13402  209 -13404 0
 13400  13401  13402  209  13405 0

c  -1-1 --> -2
c    ( b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧  b^{19, 11}_0 ∧ -p_209) -> ( b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0)
c  in CNF:
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨  b^{19, 12}_2
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨  b^{19, 12}_1
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨  p_209 ∨ -b^{19, 12}_0
c  in DIMACS:
-13400  13401 -13402  209  13403 0
-13400  13401 -13402  209  13404 0
-13400  13401 -13402  209 -13405 0

c  -2-1 --> break 
c    ( b^{19, 11}_2 ∧  b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧ -p_209) -> break
c  in CNF:
c    -b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨  b^{19, 11}_0 ∨  p_209 ∨ break
c  in DIMACS:
-13400 -13401  13402  209 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 11}_2 ∧ -b^{19, 11}_1 ∧ -b^{19, 11}_0 ∧ true) 
c  in CNF:
c    -b^{19, 11}_2 ∨  b^{19, 11}_1 ∨  b^{19, 11}_0 ∨ false 
c  in DIMACS:
-13400  13401  13402  0

c  3 does not represent an automaton state.
c    -(-b^{19, 11}_2 ∧  b^{19, 11}_1 ∧  b^{19, 11}_0 ∧ true) 
c  in CNF:
c     b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ false 
c  in DIMACS:
 13400 -13401 -13402  0
c  -3 does not represent an automaton state.
c    -( b^{19, 11}_2 ∧  b^{19, 11}_1 ∧  b^{19, 11}_0 ∧ true) 
c  in CNF:
c    -b^{19, 11}_2 ∨ -b^{19, 11}_1 ∨ -b^{19, 11}_0 ∨ false 
c  in DIMACS:
-13400 -13401 -13402  0

c i = 12
c  -2+1 --> -1
c    ( b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧  p_228) -> ( b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0)
c  in CNF:
c    -b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨  b^{19, 13}_2
c    -b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_1
c    -b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨  b^{19, 13}_0
c  in DIMACS:
-13403 -13404  13405 -228  13406 0
-13403 -13404  13405 -228 -13407 0
-13403 -13404  13405 -228  13408 0

c  -1+1 --> 0
c    ( b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0 ∧  p_228) -> (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧ -b^{19, 13}_0)
c  in CNF:
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_2
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_1
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_0
c  in DIMACS:
-13403  13404 -13405 -228 -13406 0
-13403  13404 -13405 -228 -13407 0
-13403  13404 -13405 -228 -13408 0

c  0+1 --> 1
c    (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧  p_228) -> (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0)
c  in CNF:
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_2
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_1
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨  b^{19, 13}_0
c  in DIMACS:
 13403  13404  13405 -228 -13406 0
 13403  13404  13405 -228 -13407 0
 13403  13404  13405 -228  13408 0

c  1+1 --> 2
c    (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0 ∧  p_228) -> (-b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0)
c  in CNF:
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_2
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨  b^{19, 13}_1
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ -p_228 ∨ -b^{19, 13}_0
c  in DIMACS:
 13403  13404 -13405 -228 -13406 0
 13403  13404 -13405 -228  13407 0
 13403  13404 -13405 -228 -13408 0

c  2+1 --> break 
c    (-b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧  p_228) -> break
c  in CNF:
c     b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 13403 -13404  13405 -228 1162 0


c  2-1 --> 1
c    (-b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧ -p_228) -> (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0)
c  in CNF:
c     b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_2
c     b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_1
c     b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨  b^{19, 13}_0
c  in DIMACS:
 13403 -13404  13405  228 -13406 0
 13403 -13404  13405  228 -13407 0
 13403 -13404  13405  228  13408 0

c  1-1 --> 0
c    (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0 ∧ -p_228) -> (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧ -b^{19, 13}_0)
c  in CNF:
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_2
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_1
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_0
c  in DIMACS:
 13403  13404 -13405  228 -13406 0
 13403  13404 -13405  228 -13407 0
 13403  13404 -13405  228 -13408 0

c  0-1 --> -1
c    (-b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧ -p_228) -> ( b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0)
c  in CNF:
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨  b^{19, 13}_2
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_1
c     b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨  b^{19, 13}_0
c  in DIMACS:
 13403  13404  13405  228  13406 0
 13403  13404  13405  228 -13407 0
 13403  13404  13405  228  13408 0

c  -1-1 --> -2
c    ( b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧  b^{19, 12}_0 ∧ -p_228) -> ( b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0)
c  in CNF:
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨  b^{19, 13}_2
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨  b^{19, 13}_1
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨  p_228 ∨ -b^{19, 13}_0
c  in DIMACS:
-13403  13404 -13405  228  13406 0
-13403  13404 -13405  228  13407 0
-13403  13404 -13405  228 -13408 0

c  -2-1 --> break 
c    ( b^{19, 12}_2 ∧  b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨  b^{19, 12}_0 ∨  p_228 ∨ break
c  in DIMACS:
-13403 -13404  13405  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 12}_2 ∧ -b^{19, 12}_1 ∧ -b^{19, 12}_0 ∧ true) 
c  in CNF:
c    -b^{19, 12}_2 ∨  b^{19, 12}_1 ∨  b^{19, 12}_0 ∨ false 
c  in DIMACS:
-13403  13404  13405  0

c  3 does not represent an automaton state.
c    -(-b^{19, 12}_2 ∧  b^{19, 12}_1 ∧  b^{19, 12}_0 ∧ true) 
c  in CNF:
c     b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ false 
c  in DIMACS:
 13403 -13404 -13405  0
c  -3 does not represent an automaton state.
c    -( b^{19, 12}_2 ∧  b^{19, 12}_1 ∧  b^{19, 12}_0 ∧ true) 
c  in CNF:
c    -b^{19, 12}_2 ∨ -b^{19, 12}_1 ∨ -b^{19, 12}_0 ∨ false 
c  in DIMACS:
-13403 -13404 -13405  0

c i = 13
c  -2+1 --> -1
c    ( b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧  p_247) -> ( b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0)
c  in CNF:
c    -b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨  b^{19, 14}_2
c    -b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_1
c    -b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨  b^{19, 14}_0
c  in DIMACS:
-13406 -13407  13408 -247  13409 0
-13406 -13407  13408 -247 -13410 0
-13406 -13407  13408 -247  13411 0

c  -1+1 --> 0
c    ( b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0 ∧  p_247) -> (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧ -b^{19, 14}_0)
c  in CNF:
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_2
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_1
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_0
c  in DIMACS:
-13406  13407 -13408 -247 -13409 0
-13406  13407 -13408 -247 -13410 0
-13406  13407 -13408 -247 -13411 0

c  0+1 --> 1
c    (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧  p_247) -> (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0)
c  in CNF:
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_2
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_1
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨  b^{19, 14}_0
c  in DIMACS:
 13406  13407  13408 -247 -13409 0
 13406  13407  13408 -247 -13410 0
 13406  13407  13408 -247  13411 0

c  1+1 --> 2
c    (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0 ∧  p_247) -> (-b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0)
c  in CNF:
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_2
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨  b^{19, 14}_1
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ -p_247 ∨ -b^{19, 14}_0
c  in DIMACS:
 13406  13407 -13408 -247 -13409 0
 13406  13407 -13408 -247  13410 0
 13406  13407 -13408 -247 -13411 0

c  2+1 --> break 
c    (-b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧  p_247) -> break
c  in CNF:
c     b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ -p_247 ∨ break
c  in DIMACS:
 13406 -13407  13408 -247 1162 0


c  2-1 --> 1
c    (-b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧ -p_247) -> (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0)
c  in CNF:
c     b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_2
c     b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_1
c     b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨  b^{19, 14}_0
c  in DIMACS:
 13406 -13407  13408  247 -13409 0
 13406 -13407  13408  247 -13410 0
 13406 -13407  13408  247  13411 0

c  1-1 --> 0
c    (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0 ∧ -p_247) -> (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧ -b^{19, 14}_0)
c  in CNF:
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_2
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_1
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_0
c  in DIMACS:
 13406  13407 -13408  247 -13409 0
 13406  13407 -13408  247 -13410 0
 13406  13407 -13408  247 -13411 0

c  0-1 --> -1
c    (-b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧ -p_247) -> ( b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0)
c  in CNF:
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨  b^{19, 14}_2
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_1
c     b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨  b^{19, 14}_0
c  in DIMACS:
 13406  13407  13408  247  13409 0
 13406  13407  13408  247 -13410 0
 13406  13407  13408  247  13411 0

c  -1-1 --> -2
c    ( b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧  b^{19, 13}_0 ∧ -p_247) -> ( b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0)
c  in CNF:
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨  b^{19, 14}_2
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨  b^{19, 14}_1
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨  p_247 ∨ -b^{19, 14}_0
c  in DIMACS:
-13406  13407 -13408  247  13409 0
-13406  13407 -13408  247  13410 0
-13406  13407 -13408  247 -13411 0

c  -2-1 --> break 
c    ( b^{19, 13}_2 ∧  b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧ -p_247) -> break
c  in CNF:
c    -b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨  b^{19, 13}_0 ∨  p_247 ∨ break
c  in DIMACS:
-13406 -13407  13408  247 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 13}_2 ∧ -b^{19, 13}_1 ∧ -b^{19, 13}_0 ∧ true) 
c  in CNF:
c    -b^{19, 13}_2 ∨  b^{19, 13}_1 ∨  b^{19, 13}_0 ∨ false 
c  in DIMACS:
-13406  13407  13408  0

c  3 does not represent an automaton state.
c    -(-b^{19, 13}_2 ∧  b^{19, 13}_1 ∧  b^{19, 13}_0 ∧ true) 
c  in CNF:
c     b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ false 
c  in DIMACS:
 13406 -13407 -13408  0
c  -3 does not represent an automaton state.
c    -( b^{19, 13}_2 ∧  b^{19, 13}_1 ∧  b^{19, 13}_0 ∧ true) 
c  in CNF:
c    -b^{19, 13}_2 ∨ -b^{19, 13}_1 ∨ -b^{19, 13}_0 ∨ false 
c  in DIMACS:
-13406 -13407 -13408  0

c i = 14
c  -2+1 --> -1
c    ( b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧  p_266) -> ( b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0)
c  in CNF:
c    -b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨  b^{19, 15}_2
c    -b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_1
c    -b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨  b^{19, 15}_0
c  in DIMACS:
-13409 -13410  13411 -266  13412 0
-13409 -13410  13411 -266 -13413 0
-13409 -13410  13411 -266  13414 0

c  -1+1 --> 0
c    ( b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0 ∧  p_266) -> (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧ -b^{19, 15}_0)
c  in CNF:
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_2
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_1
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_0
c  in DIMACS:
-13409  13410 -13411 -266 -13412 0
-13409  13410 -13411 -266 -13413 0
-13409  13410 -13411 -266 -13414 0

c  0+1 --> 1
c    (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧  p_266) -> (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0)
c  in CNF:
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_2
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_1
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨  b^{19, 15}_0
c  in DIMACS:
 13409  13410  13411 -266 -13412 0
 13409  13410  13411 -266 -13413 0
 13409  13410  13411 -266  13414 0

c  1+1 --> 2
c    (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0 ∧  p_266) -> (-b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0)
c  in CNF:
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_2
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨  b^{19, 15}_1
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ -p_266 ∨ -b^{19, 15}_0
c  in DIMACS:
 13409  13410 -13411 -266 -13412 0
 13409  13410 -13411 -266  13413 0
 13409  13410 -13411 -266 -13414 0

c  2+1 --> break 
c    (-b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧  p_266) -> break
c  in CNF:
c     b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 13409 -13410  13411 -266 1162 0


c  2-1 --> 1
c    (-b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧ -p_266) -> (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0)
c  in CNF:
c     b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_2
c     b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_1
c     b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨  b^{19, 15}_0
c  in DIMACS:
 13409 -13410  13411  266 -13412 0
 13409 -13410  13411  266 -13413 0
 13409 -13410  13411  266  13414 0

c  1-1 --> 0
c    (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0 ∧ -p_266) -> (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧ -b^{19, 15}_0)
c  in CNF:
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_2
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_1
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_0
c  in DIMACS:
 13409  13410 -13411  266 -13412 0
 13409  13410 -13411  266 -13413 0
 13409  13410 -13411  266 -13414 0

c  0-1 --> -1
c    (-b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧ -p_266) -> ( b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0)
c  in CNF:
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨  b^{19, 15}_2
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_1
c     b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨  b^{19, 15}_0
c  in DIMACS:
 13409  13410  13411  266  13412 0
 13409  13410  13411  266 -13413 0
 13409  13410  13411  266  13414 0

c  -1-1 --> -2
c    ( b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧  b^{19, 14}_0 ∧ -p_266) -> ( b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0)
c  in CNF:
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨  b^{19, 15}_2
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨  b^{19, 15}_1
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨  p_266 ∨ -b^{19, 15}_0
c  in DIMACS:
-13409  13410 -13411  266  13412 0
-13409  13410 -13411  266  13413 0
-13409  13410 -13411  266 -13414 0

c  -2-1 --> break 
c    ( b^{19, 14}_2 ∧  b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨  b^{19, 14}_0 ∨  p_266 ∨ break
c  in DIMACS:
-13409 -13410  13411  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 14}_2 ∧ -b^{19, 14}_1 ∧ -b^{19, 14}_0 ∧ true) 
c  in CNF:
c    -b^{19, 14}_2 ∨  b^{19, 14}_1 ∨  b^{19, 14}_0 ∨ false 
c  in DIMACS:
-13409  13410  13411  0

c  3 does not represent an automaton state.
c    -(-b^{19, 14}_2 ∧  b^{19, 14}_1 ∧  b^{19, 14}_0 ∧ true) 
c  in CNF:
c     b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ false 
c  in DIMACS:
 13409 -13410 -13411  0
c  -3 does not represent an automaton state.
c    -( b^{19, 14}_2 ∧  b^{19, 14}_1 ∧  b^{19, 14}_0 ∧ true) 
c  in CNF:
c    -b^{19, 14}_2 ∨ -b^{19, 14}_1 ∨ -b^{19, 14}_0 ∨ false 
c  in DIMACS:
-13409 -13410 -13411  0

c i = 15
c  -2+1 --> -1
c    ( b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧  p_285) -> ( b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0)
c  in CNF:
c    -b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨  b^{19, 16}_2
c    -b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_1
c    -b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨  b^{19, 16}_0
c  in DIMACS:
-13412 -13413  13414 -285  13415 0
-13412 -13413  13414 -285 -13416 0
-13412 -13413  13414 -285  13417 0

c  -1+1 --> 0
c    ( b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0 ∧  p_285) -> (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧ -b^{19, 16}_0)
c  in CNF:
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_2
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_1
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_0
c  in DIMACS:
-13412  13413 -13414 -285 -13415 0
-13412  13413 -13414 -285 -13416 0
-13412  13413 -13414 -285 -13417 0

c  0+1 --> 1
c    (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧  p_285) -> (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0)
c  in CNF:
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_2
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_1
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨  b^{19, 16}_0
c  in DIMACS:
 13412  13413  13414 -285 -13415 0
 13412  13413  13414 -285 -13416 0
 13412  13413  13414 -285  13417 0

c  1+1 --> 2
c    (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0 ∧  p_285) -> (-b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0)
c  in CNF:
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_2
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨  b^{19, 16}_1
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ -p_285 ∨ -b^{19, 16}_0
c  in DIMACS:
 13412  13413 -13414 -285 -13415 0
 13412  13413 -13414 -285  13416 0
 13412  13413 -13414 -285 -13417 0

c  2+1 --> break 
c    (-b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧  p_285) -> break
c  in CNF:
c     b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 13412 -13413  13414 -285 1162 0


c  2-1 --> 1
c    (-b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧ -p_285) -> (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0)
c  in CNF:
c     b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_2
c     b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_1
c     b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨  b^{19, 16}_0
c  in DIMACS:
 13412 -13413  13414  285 -13415 0
 13412 -13413  13414  285 -13416 0
 13412 -13413  13414  285  13417 0

c  1-1 --> 0
c    (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0 ∧ -p_285) -> (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧ -b^{19, 16}_0)
c  in CNF:
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_2
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_1
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_0
c  in DIMACS:
 13412  13413 -13414  285 -13415 0
 13412  13413 -13414  285 -13416 0
 13412  13413 -13414  285 -13417 0

c  0-1 --> -1
c    (-b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧ -p_285) -> ( b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0)
c  in CNF:
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨  b^{19, 16}_2
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_1
c     b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨  b^{19, 16}_0
c  in DIMACS:
 13412  13413  13414  285  13415 0
 13412  13413  13414  285 -13416 0
 13412  13413  13414  285  13417 0

c  -1-1 --> -2
c    ( b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧  b^{19, 15}_0 ∧ -p_285) -> ( b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0)
c  in CNF:
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨  b^{19, 16}_2
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨  b^{19, 16}_1
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨  p_285 ∨ -b^{19, 16}_0
c  in DIMACS:
-13412  13413 -13414  285  13415 0
-13412  13413 -13414  285  13416 0
-13412  13413 -13414  285 -13417 0

c  -2-1 --> break 
c    ( b^{19, 15}_2 ∧  b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨  b^{19, 15}_0 ∨  p_285 ∨ break
c  in DIMACS:
-13412 -13413  13414  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 15}_2 ∧ -b^{19, 15}_1 ∧ -b^{19, 15}_0 ∧ true) 
c  in CNF:
c    -b^{19, 15}_2 ∨  b^{19, 15}_1 ∨  b^{19, 15}_0 ∨ false 
c  in DIMACS:
-13412  13413  13414  0

c  3 does not represent an automaton state.
c    -(-b^{19, 15}_2 ∧  b^{19, 15}_1 ∧  b^{19, 15}_0 ∧ true) 
c  in CNF:
c     b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ false 
c  in DIMACS:
 13412 -13413 -13414  0
c  -3 does not represent an automaton state.
c    -( b^{19, 15}_2 ∧  b^{19, 15}_1 ∧  b^{19, 15}_0 ∧ true) 
c  in CNF:
c    -b^{19, 15}_2 ∨ -b^{19, 15}_1 ∨ -b^{19, 15}_0 ∨ false 
c  in DIMACS:
-13412 -13413 -13414  0

c i = 16
c  -2+1 --> -1
c    ( b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧  p_304) -> ( b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0)
c  in CNF:
c    -b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨  b^{19, 17}_2
c    -b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_1
c    -b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨  b^{19, 17}_0
c  in DIMACS:
-13415 -13416  13417 -304  13418 0
-13415 -13416  13417 -304 -13419 0
-13415 -13416  13417 -304  13420 0

c  -1+1 --> 0
c    ( b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0 ∧  p_304) -> (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧ -b^{19, 17}_0)
c  in CNF:
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_2
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_1
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_0
c  in DIMACS:
-13415  13416 -13417 -304 -13418 0
-13415  13416 -13417 -304 -13419 0
-13415  13416 -13417 -304 -13420 0

c  0+1 --> 1
c    (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧  p_304) -> (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0)
c  in CNF:
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_2
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_1
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨  b^{19, 17}_0
c  in DIMACS:
 13415  13416  13417 -304 -13418 0
 13415  13416  13417 -304 -13419 0
 13415  13416  13417 -304  13420 0

c  1+1 --> 2
c    (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0 ∧  p_304) -> (-b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0)
c  in CNF:
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_2
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨  b^{19, 17}_1
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ -p_304 ∨ -b^{19, 17}_0
c  in DIMACS:
 13415  13416 -13417 -304 -13418 0
 13415  13416 -13417 -304  13419 0
 13415  13416 -13417 -304 -13420 0

c  2+1 --> break 
c    (-b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧  p_304) -> break
c  in CNF:
c     b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 13415 -13416  13417 -304 1162 0


c  2-1 --> 1
c    (-b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧ -p_304) -> (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0)
c  in CNF:
c     b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_2
c     b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_1
c     b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨  b^{19, 17}_0
c  in DIMACS:
 13415 -13416  13417  304 -13418 0
 13415 -13416  13417  304 -13419 0
 13415 -13416  13417  304  13420 0

c  1-1 --> 0
c    (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0 ∧ -p_304) -> (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧ -b^{19, 17}_0)
c  in CNF:
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_2
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_1
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_0
c  in DIMACS:
 13415  13416 -13417  304 -13418 0
 13415  13416 -13417  304 -13419 0
 13415  13416 -13417  304 -13420 0

c  0-1 --> -1
c    (-b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧ -p_304) -> ( b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0)
c  in CNF:
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨  b^{19, 17}_2
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_1
c     b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨  b^{19, 17}_0
c  in DIMACS:
 13415  13416  13417  304  13418 0
 13415  13416  13417  304 -13419 0
 13415  13416  13417  304  13420 0

c  -1-1 --> -2
c    ( b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧  b^{19, 16}_0 ∧ -p_304) -> ( b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0)
c  in CNF:
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨  b^{19, 17}_2
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨  b^{19, 17}_1
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨  p_304 ∨ -b^{19, 17}_0
c  in DIMACS:
-13415  13416 -13417  304  13418 0
-13415  13416 -13417  304  13419 0
-13415  13416 -13417  304 -13420 0

c  -2-1 --> break 
c    ( b^{19, 16}_2 ∧  b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨  b^{19, 16}_0 ∨  p_304 ∨ break
c  in DIMACS:
-13415 -13416  13417  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 16}_2 ∧ -b^{19, 16}_1 ∧ -b^{19, 16}_0 ∧ true) 
c  in CNF:
c    -b^{19, 16}_2 ∨  b^{19, 16}_1 ∨  b^{19, 16}_0 ∨ false 
c  in DIMACS:
-13415  13416  13417  0

c  3 does not represent an automaton state.
c    -(-b^{19, 16}_2 ∧  b^{19, 16}_1 ∧  b^{19, 16}_0 ∧ true) 
c  in CNF:
c     b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ false 
c  in DIMACS:
 13415 -13416 -13417  0
c  -3 does not represent an automaton state.
c    -( b^{19, 16}_2 ∧  b^{19, 16}_1 ∧  b^{19, 16}_0 ∧ true) 
c  in CNF:
c    -b^{19, 16}_2 ∨ -b^{19, 16}_1 ∨ -b^{19, 16}_0 ∨ false 
c  in DIMACS:
-13415 -13416 -13417  0

c i = 17
c  -2+1 --> -1
c    ( b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧  p_323) -> ( b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0)
c  in CNF:
c    -b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨  b^{19, 18}_2
c    -b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_1
c    -b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨  b^{19, 18}_0
c  in DIMACS:
-13418 -13419  13420 -323  13421 0
-13418 -13419  13420 -323 -13422 0
-13418 -13419  13420 -323  13423 0

c  -1+1 --> 0
c    ( b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0 ∧  p_323) -> (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧ -b^{19, 18}_0)
c  in CNF:
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_2
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_1
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_0
c  in DIMACS:
-13418  13419 -13420 -323 -13421 0
-13418  13419 -13420 -323 -13422 0
-13418  13419 -13420 -323 -13423 0

c  0+1 --> 1
c    (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧  p_323) -> (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0)
c  in CNF:
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_2
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_1
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨  b^{19, 18}_0
c  in DIMACS:
 13418  13419  13420 -323 -13421 0
 13418  13419  13420 -323 -13422 0
 13418  13419  13420 -323  13423 0

c  1+1 --> 2
c    (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0 ∧  p_323) -> (-b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0)
c  in CNF:
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_2
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨  b^{19, 18}_1
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ -p_323 ∨ -b^{19, 18}_0
c  in DIMACS:
 13418  13419 -13420 -323 -13421 0
 13418  13419 -13420 -323  13422 0
 13418  13419 -13420 -323 -13423 0

c  2+1 --> break 
c    (-b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧  p_323) -> break
c  in CNF:
c     b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ -p_323 ∨ break
c  in DIMACS:
 13418 -13419  13420 -323 1162 0


c  2-1 --> 1
c    (-b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧ -p_323) -> (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0)
c  in CNF:
c     b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_2
c     b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_1
c     b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨  b^{19, 18}_0
c  in DIMACS:
 13418 -13419  13420  323 -13421 0
 13418 -13419  13420  323 -13422 0
 13418 -13419  13420  323  13423 0

c  1-1 --> 0
c    (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0 ∧ -p_323) -> (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧ -b^{19, 18}_0)
c  in CNF:
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_2
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_1
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_0
c  in DIMACS:
 13418  13419 -13420  323 -13421 0
 13418  13419 -13420  323 -13422 0
 13418  13419 -13420  323 -13423 0

c  0-1 --> -1
c    (-b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧ -p_323) -> ( b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0)
c  in CNF:
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨  b^{19, 18}_2
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_1
c     b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨  b^{19, 18}_0
c  in DIMACS:
 13418  13419  13420  323  13421 0
 13418  13419  13420  323 -13422 0
 13418  13419  13420  323  13423 0

c  -1-1 --> -2
c    ( b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧  b^{19, 17}_0 ∧ -p_323) -> ( b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0)
c  in CNF:
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨  b^{19, 18}_2
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨  b^{19, 18}_1
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨  p_323 ∨ -b^{19, 18}_0
c  in DIMACS:
-13418  13419 -13420  323  13421 0
-13418  13419 -13420  323  13422 0
-13418  13419 -13420  323 -13423 0

c  -2-1 --> break 
c    ( b^{19, 17}_2 ∧  b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧ -p_323) -> break
c  in CNF:
c    -b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨  b^{19, 17}_0 ∨  p_323 ∨ break
c  in DIMACS:
-13418 -13419  13420  323 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 17}_2 ∧ -b^{19, 17}_1 ∧ -b^{19, 17}_0 ∧ true) 
c  in CNF:
c    -b^{19, 17}_2 ∨  b^{19, 17}_1 ∨  b^{19, 17}_0 ∨ false 
c  in DIMACS:
-13418  13419  13420  0

c  3 does not represent an automaton state.
c    -(-b^{19, 17}_2 ∧  b^{19, 17}_1 ∧  b^{19, 17}_0 ∧ true) 
c  in CNF:
c     b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ false 
c  in DIMACS:
 13418 -13419 -13420  0
c  -3 does not represent an automaton state.
c    -( b^{19, 17}_2 ∧  b^{19, 17}_1 ∧  b^{19, 17}_0 ∧ true) 
c  in CNF:
c    -b^{19, 17}_2 ∨ -b^{19, 17}_1 ∨ -b^{19, 17}_0 ∨ false 
c  in DIMACS:
-13418 -13419 -13420  0

c i = 18
c  -2+1 --> -1
c    ( b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧  p_342) -> ( b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0)
c  in CNF:
c    -b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨  b^{19, 19}_2
c    -b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_1
c    -b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨  b^{19, 19}_0
c  in DIMACS:
-13421 -13422  13423 -342  13424 0
-13421 -13422  13423 -342 -13425 0
-13421 -13422  13423 -342  13426 0

c  -1+1 --> 0
c    ( b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0 ∧  p_342) -> (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧ -b^{19, 19}_0)
c  in CNF:
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_2
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_1
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_0
c  in DIMACS:
-13421  13422 -13423 -342 -13424 0
-13421  13422 -13423 -342 -13425 0
-13421  13422 -13423 -342 -13426 0

c  0+1 --> 1
c    (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧  p_342) -> (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0)
c  in CNF:
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_2
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_1
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨  b^{19, 19}_0
c  in DIMACS:
 13421  13422  13423 -342 -13424 0
 13421  13422  13423 -342 -13425 0
 13421  13422  13423 -342  13426 0

c  1+1 --> 2
c    (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0 ∧  p_342) -> (-b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0)
c  in CNF:
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_2
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨  b^{19, 19}_1
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ -p_342 ∨ -b^{19, 19}_0
c  in DIMACS:
 13421  13422 -13423 -342 -13424 0
 13421  13422 -13423 -342  13425 0
 13421  13422 -13423 -342 -13426 0

c  2+1 --> break 
c    (-b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧  p_342) -> break
c  in CNF:
c     b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 13421 -13422  13423 -342 1162 0


c  2-1 --> 1
c    (-b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧ -p_342) -> (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0)
c  in CNF:
c     b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_2
c     b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_1
c     b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨  b^{19, 19}_0
c  in DIMACS:
 13421 -13422  13423  342 -13424 0
 13421 -13422  13423  342 -13425 0
 13421 -13422  13423  342  13426 0

c  1-1 --> 0
c    (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0 ∧ -p_342) -> (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧ -b^{19, 19}_0)
c  in CNF:
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_2
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_1
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_0
c  in DIMACS:
 13421  13422 -13423  342 -13424 0
 13421  13422 -13423  342 -13425 0
 13421  13422 -13423  342 -13426 0

c  0-1 --> -1
c    (-b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧ -p_342) -> ( b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0)
c  in CNF:
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨  b^{19, 19}_2
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_1
c     b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨  b^{19, 19}_0
c  in DIMACS:
 13421  13422  13423  342  13424 0
 13421  13422  13423  342 -13425 0
 13421  13422  13423  342  13426 0

c  -1-1 --> -2
c    ( b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧  b^{19, 18}_0 ∧ -p_342) -> ( b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0)
c  in CNF:
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨  b^{19, 19}_2
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨  b^{19, 19}_1
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨  p_342 ∨ -b^{19, 19}_0
c  in DIMACS:
-13421  13422 -13423  342  13424 0
-13421  13422 -13423  342  13425 0
-13421  13422 -13423  342 -13426 0

c  -2-1 --> break 
c    ( b^{19, 18}_2 ∧  b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨  b^{19, 18}_0 ∨  p_342 ∨ break
c  in DIMACS:
-13421 -13422  13423  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 18}_2 ∧ -b^{19, 18}_1 ∧ -b^{19, 18}_0 ∧ true) 
c  in CNF:
c    -b^{19, 18}_2 ∨  b^{19, 18}_1 ∨  b^{19, 18}_0 ∨ false 
c  in DIMACS:
-13421  13422  13423  0

c  3 does not represent an automaton state.
c    -(-b^{19, 18}_2 ∧  b^{19, 18}_1 ∧  b^{19, 18}_0 ∧ true) 
c  in CNF:
c     b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ false 
c  in DIMACS:
 13421 -13422 -13423  0
c  -3 does not represent an automaton state.
c    -( b^{19, 18}_2 ∧  b^{19, 18}_1 ∧  b^{19, 18}_0 ∧ true) 
c  in CNF:
c    -b^{19, 18}_2 ∨ -b^{19, 18}_1 ∨ -b^{19, 18}_0 ∨ false 
c  in DIMACS:
-13421 -13422 -13423  0

c i = 19
c  -2+1 --> -1
c    ( b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧  p_361) -> ( b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0)
c  in CNF:
c    -b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨  b^{19, 20}_2
c    -b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_1
c    -b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨  b^{19, 20}_0
c  in DIMACS:
-13424 -13425  13426 -361  13427 0
-13424 -13425  13426 -361 -13428 0
-13424 -13425  13426 -361  13429 0

c  -1+1 --> 0
c    ( b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0 ∧  p_361) -> (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧ -b^{19, 20}_0)
c  in CNF:
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_2
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_1
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_0
c  in DIMACS:
-13424  13425 -13426 -361 -13427 0
-13424  13425 -13426 -361 -13428 0
-13424  13425 -13426 -361 -13429 0

c  0+1 --> 1
c    (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧  p_361) -> (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0)
c  in CNF:
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_2
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_1
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨  b^{19, 20}_0
c  in DIMACS:
 13424  13425  13426 -361 -13427 0
 13424  13425  13426 -361 -13428 0
 13424  13425  13426 -361  13429 0

c  1+1 --> 2
c    (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0 ∧  p_361) -> (-b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0)
c  in CNF:
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_2
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨  b^{19, 20}_1
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ -p_361 ∨ -b^{19, 20}_0
c  in DIMACS:
 13424  13425 -13426 -361 -13427 0
 13424  13425 -13426 -361  13428 0
 13424  13425 -13426 -361 -13429 0

c  2+1 --> break 
c    (-b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧  p_361) -> break
c  in CNF:
c     b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ -p_361 ∨ break
c  in DIMACS:
 13424 -13425  13426 -361 1162 0


c  2-1 --> 1
c    (-b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧ -p_361) -> (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0)
c  in CNF:
c     b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_2
c     b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_1
c     b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨  b^{19, 20}_0
c  in DIMACS:
 13424 -13425  13426  361 -13427 0
 13424 -13425  13426  361 -13428 0
 13424 -13425  13426  361  13429 0

c  1-1 --> 0
c    (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0 ∧ -p_361) -> (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧ -b^{19, 20}_0)
c  in CNF:
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_2
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_1
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_0
c  in DIMACS:
 13424  13425 -13426  361 -13427 0
 13424  13425 -13426  361 -13428 0
 13424  13425 -13426  361 -13429 0

c  0-1 --> -1
c    (-b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧ -p_361) -> ( b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0)
c  in CNF:
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨  b^{19, 20}_2
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_1
c     b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨  b^{19, 20}_0
c  in DIMACS:
 13424  13425  13426  361  13427 0
 13424  13425  13426  361 -13428 0
 13424  13425  13426  361  13429 0

c  -1-1 --> -2
c    ( b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧  b^{19, 19}_0 ∧ -p_361) -> ( b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0)
c  in CNF:
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨  b^{19, 20}_2
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨  b^{19, 20}_1
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨  p_361 ∨ -b^{19, 20}_0
c  in DIMACS:
-13424  13425 -13426  361  13427 0
-13424  13425 -13426  361  13428 0
-13424  13425 -13426  361 -13429 0

c  -2-1 --> break 
c    ( b^{19, 19}_2 ∧  b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧ -p_361) -> break
c  in CNF:
c    -b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨  b^{19, 19}_0 ∨  p_361 ∨ break
c  in DIMACS:
-13424 -13425  13426  361 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 19}_2 ∧ -b^{19, 19}_1 ∧ -b^{19, 19}_0 ∧ true) 
c  in CNF:
c    -b^{19, 19}_2 ∨  b^{19, 19}_1 ∨  b^{19, 19}_0 ∨ false 
c  in DIMACS:
-13424  13425  13426  0

c  3 does not represent an automaton state.
c    -(-b^{19, 19}_2 ∧  b^{19, 19}_1 ∧  b^{19, 19}_0 ∧ true) 
c  in CNF:
c     b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ false 
c  in DIMACS:
 13424 -13425 -13426  0
c  -3 does not represent an automaton state.
c    -( b^{19, 19}_2 ∧  b^{19, 19}_1 ∧  b^{19, 19}_0 ∧ true) 
c  in CNF:
c    -b^{19, 19}_2 ∨ -b^{19, 19}_1 ∨ -b^{19, 19}_0 ∨ false 
c  in DIMACS:
-13424 -13425 -13426  0

c i = 20
c  -2+1 --> -1
c    ( b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧  p_380) -> ( b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0)
c  in CNF:
c    -b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨  b^{19, 21}_2
c    -b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_1
c    -b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨  b^{19, 21}_0
c  in DIMACS:
-13427 -13428  13429 -380  13430 0
-13427 -13428  13429 -380 -13431 0
-13427 -13428  13429 -380  13432 0

c  -1+1 --> 0
c    ( b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0 ∧  p_380) -> (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧ -b^{19, 21}_0)
c  in CNF:
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_2
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_1
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_0
c  in DIMACS:
-13427  13428 -13429 -380 -13430 0
-13427  13428 -13429 -380 -13431 0
-13427  13428 -13429 -380 -13432 0

c  0+1 --> 1
c    (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧  p_380) -> (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0)
c  in CNF:
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_2
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_1
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨  b^{19, 21}_0
c  in DIMACS:
 13427  13428  13429 -380 -13430 0
 13427  13428  13429 -380 -13431 0
 13427  13428  13429 -380  13432 0

c  1+1 --> 2
c    (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0 ∧  p_380) -> (-b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0)
c  in CNF:
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_2
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨  b^{19, 21}_1
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ -p_380 ∨ -b^{19, 21}_0
c  in DIMACS:
 13427  13428 -13429 -380 -13430 0
 13427  13428 -13429 -380  13431 0
 13427  13428 -13429 -380 -13432 0

c  2+1 --> break 
c    (-b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧  p_380) -> break
c  in CNF:
c     b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 13427 -13428  13429 -380 1162 0


c  2-1 --> 1
c    (-b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧ -p_380) -> (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0)
c  in CNF:
c     b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_2
c     b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_1
c     b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨  b^{19, 21}_0
c  in DIMACS:
 13427 -13428  13429  380 -13430 0
 13427 -13428  13429  380 -13431 0
 13427 -13428  13429  380  13432 0

c  1-1 --> 0
c    (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0 ∧ -p_380) -> (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧ -b^{19, 21}_0)
c  in CNF:
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_2
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_1
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_0
c  in DIMACS:
 13427  13428 -13429  380 -13430 0
 13427  13428 -13429  380 -13431 0
 13427  13428 -13429  380 -13432 0

c  0-1 --> -1
c    (-b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧ -p_380) -> ( b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0)
c  in CNF:
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨  b^{19, 21}_2
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_1
c     b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨  b^{19, 21}_0
c  in DIMACS:
 13427  13428  13429  380  13430 0
 13427  13428  13429  380 -13431 0
 13427  13428  13429  380  13432 0

c  -1-1 --> -2
c    ( b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧  b^{19, 20}_0 ∧ -p_380) -> ( b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0)
c  in CNF:
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨  b^{19, 21}_2
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨  b^{19, 21}_1
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨  p_380 ∨ -b^{19, 21}_0
c  in DIMACS:
-13427  13428 -13429  380  13430 0
-13427  13428 -13429  380  13431 0
-13427  13428 -13429  380 -13432 0

c  -2-1 --> break 
c    ( b^{19, 20}_2 ∧  b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨  b^{19, 20}_0 ∨  p_380 ∨ break
c  in DIMACS:
-13427 -13428  13429  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 20}_2 ∧ -b^{19, 20}_1 ∧ -b^{19, 20}_0 ∧ true) 
c  in CNF:
c    -b^{19, 20}_2 ∨  b^{19, 20}_1 ∨  b^{19, 20}_0 ∨ false 
c  in DIMACS:
-13427  13428  13429  0

c  3 does not represent an automaton state.
c    -(-b^{19, 20}_2 ∧  b^{19, 20}_1 ∧  b^{19, 20}_0 ∧ true) 
c  in CNF:
c     b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ false 
c  in DIMACS:
 13427 -13428 -13429  0
c  -3 does not represent an automaton state.
c    -( b^{19, 20}_2 ∧  b^{19, 20}_1 ∧  b^{19, 20}_0 ∧ true) 
c  in CNF:
c    -b^{19, 20}_2 ∨ -b^{19, 20}_1 ∨ -b^{19, 20}_0 ∨ false 
c  in DIMACS:
-13427 -13428 -13429  0

c i = 21
c  -2+1 --> -1
c    ( b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧  p_399) -> ( b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0)
c  in CNF:
c    -b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨  b^{19, 22}_2
c    -b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_1
c    -b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨  b^{19, 22}_0
c  in DIMACS:
-13430 -13431  13432 -399  13433 0
-13430 -13431  13432 -399 -13434 0
-13430 -13431  13432 -399  13435 0

c  -1+1 --> 0
c    ( b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0 ∧  p_399) -> (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧ -b^{19, 22}_0)
c  in CNF:
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_2
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_1
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_0
c  in DIMACS:
-13430  13431 -13432 -399 -13433 0
-13430  13431 -13432 -399 -13434 0
-13430  13431 -13432 -399 -13435 0

c  0+1 --> 1
c    (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧  p_399) -> (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0)
c  in CNF:
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_2
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_1
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨  b^{19, 22}_0
c  in DIMACS:
 13430  13431  13432 -399 -13433 0
 13430  13431  13432 -399 -13434 0
 13430  13431  13432 -399  13435 0

c  1+1 --> 2
c    (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0 ∧  p_399) -> (-b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0)
c  in CNF:
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_2
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨  b^{19, 22}_1
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ -p_399 ∨ -b^{19, 22}_0
c  in DIMACS:
 13430  13431 -13432 -399 -13433 0
 13430  13431 -13432 -399  13434 0
 13430  13431 -13432 -399 -13435 0

c  2+1 --> break 
c    (-b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧  p_399) -> break
c  in CNF:
c     b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 13430 -13431  13432 -399 1162 0


c  2-1 --> 1
c    (-b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧ -p_399) -> (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0)
c  in CNF:
c     b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_2
c     b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_1
c     b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨  b^{19, 22}_0
c  in DIMACS:
 13430 -13431  13432  399 -13433 0
 13430 -13431  13432  399 -13434 0
 13430 -13431  13432  399  13435 0

c  1-1 --> 0
c    (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0 ∧ -p_399) -> (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧ -b^{19, 22}_0)
c  in CNF:
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_2
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_1
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_0
c  in DIMACS:
 13430  13431 -13432  399 -13433 0
 13430  13431 -13432  399 -13434 0
 13430  13431 -13432  399 -13435 0

c  0-1 --> -1
c    (-b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧ -p_399) -> ( b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0)
c  in CNF:
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨  b^{19, 22}_2
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_1
c     b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨  b^{19, 22}_0
c  in DIMACS:
 13430  13431  13432  399  13433 0
 13430  13431  13432  399 -13434 0
 13430  13431  13432  399  13435 0

c  -1-1 --> -2
c    ( b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧  b^{19, 21}_0 ∧ -p_399) -> ( b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0)
c  in CNF:
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨  b^{19, 22}_2
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨  b^{19, 22}_1
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨  p_399 ∨ -b^{19, 22}_0
c  in DIMACS:
-13430  13431 -13432  399  13433 0
-13430  13431 -13432  399  13434 0
-13430  13431 -13432  399 -13435 0

c  -2-1 --> break 
c    ( b^{19, 21}_2 ∧  b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨  b^{19, 21}_0 ∨  p_399 ∨ break
c  in DIMACS:
-13430 -13431  13432  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 21}_2 ∧ -b^{19, 21}_1 ∧ -b^{19, 21}_0 ∧ true) 
c  in CNF:
c    -b^{19, 21}_2 ∨  b^{19, 21}_1 ∨  b^{19, 21}_0 ∨ false 
c  in DIMACS:
-13430  13431  13432  0

c  3 does not represent an automaton state.
c    -(-b^{19, 21}_2 ∧  b^{19, 21}_1 ∧  b^{19, 21}_0 ∧ true) 
c  in CNF:
c     b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ false 
c  in DIMACS:
 13430 -13431 -13432  0
c  -3 does not represent an automaton state.
c    -( b^{19, 21}_2 ∧  b^{19, 21}_1 ∧  b^{19, 21}_0 ∧ true) 
c  in CNF:
c    -b^{19, 21}_2 ∨ -b^{19, 21}_1 ∨ -b^{19, 21}_0 ∨ false 
c  in DIMACS:
-13430 -13431 -13432  0

c i = 22
c  -2+1 --> -1
c    ( b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧  p_418) -> ( b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0)
c  in CNF:
c    -b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨  b^{19, 23}_2
c    -b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_1
c    -b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨  b^{19, 23}_0
c  in DIMACS:
-13433 -13434  13435 -418  13436 0
-13433 -13434  13435 -418 -13437 0
-13433 -13434  13435 -418  13438 0

c  -1+1 --> 0
c    ( b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0 ∧  p_418) -> (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧ -b^{19, 23}_0)
c  in CNF:
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_2
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_1
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_0
c  in DIMACS:
-13433  13434 -13435 -418 -13436 0
-13433  13434 -13435 -418 -13437 0
-13433  13434 -13435 -418 -13438 0

c  0+1 --> 1
c    (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧  p_418) -> (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0)
c  in CNF:
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_2
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_1
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨  b^{19, 23}_0
c  in DIMACS:
 13433  13434  13435 -418 -13436 0
 13433  13434  13435 -418 -13437 0
 13433  13434  13435 -418  13438 0

c  1+1 --> 2
c    (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0 ∧  p_418) -> (-b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0)
c  in CNF:
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_2
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨  b^{19, 23}_1
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ -p_418 ∨ -b^{19, 23}_0
c  in DIMACS:
 13433  13434 -13435 -418 -13436 0
 13433  13434 -13435 -418  13437 0
 13433  13434 -13435 -418 -13438 0

c  2+1 --> break 
c    (-b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧  p_418) -> break
c  in CNF:
c     b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 13433 -13434  13435 -418 1162 0


c  2-1 --> 1
c    (-b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧ -p_418) -> (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0)
c  in CNF:
c     b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_2
c     b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_1
c     b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨  b^{19, 23}_0
c  in DIMACS:
 13433 -13434  13435  418 -13436 0
 13433 -13434  13435  418 -13437 0
 13433 -13434  13435  418  13438 0

c  1-1 --> 0
c    (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0 ∧ -p_418) -> (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧ -b^{19, 23}_0)
c  in CNF:
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_2
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_1
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_0
c  in DIMACS:
 13433  13434 -13435  418 -13436 0
 13433  13434 -13435  418 -13437 0
 13433  13434 -13435  418 -13438 0

c  0-1 --> -1
c    (-b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧ -p_418) -> ( b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0)
c  in CNF:
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨  b^{19, 23}_2
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_1
c     b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨  b^{19, 23}_0
c  in DIMACS:
 13433  13434  13435  418  13436 0
 13433  13434  13435  418 -13437 0
 13433  13434  13435  418  13438 0

c  -1-1 --> -2
c    ( b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧  b^{19, 22}_0 ∧ -p_418) -> ( b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0)
c  in CNF:
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨  b^{19, 23}_2
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨  b^{19, 23}_1
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨  p_418 ∨ -b^{19, 23}_0
c  in DIMACS:
-13433  13434 -13435  418  13436 0
-13433  13434 -13435  418  13437 0
-13433  13434 -13435  418 -13438 0

c  -2-1 --> break 
c    ( b^{19, 22}_2 ∧  b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨  b^{19, 22}_0 ∨  p_418 ∨ break
c  in DIMACS:
-13433 -13434  13435  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 22}_2 ∧ -b^{19, 22}_1 ∧ -b^{19, 22}_0 ∧ true) 
c  in CNF:
c    -b^{19, 22}_2 ∨  b^{19, 22}_1 ∨  b^{19, 22}_0 ∨ false 
c  in DIMACS:
-13433  13434  13435  0

c  3 does not represent an automaton state.
c    -(-b^{19, 22}_2 ∧  b^{19, 22}_1 ∧  b^{19, 22}_0 ∧ true) 
c  in CNF:
c     b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ false 
c  in DIMACS:
 13433 -13434 -13435  0
c  -3 does not represent an automaton state.
c    -( b^{19, 22}_2 ∧  b^{19, 22}_1 ∧  b^{19, 22}_0 ∧ true) 
c  in CNF:
c    -b^{19, 22}_2 ∨ -b^{19, 22}_1 ∨ -b^{19, 22}_0 ∨ false 
c  in DIMACS:
-13433 -13434 -13435  0

c i = 23
c  -2+1 --> -1
c    ( b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧  p_437) -> ( b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0)
c  in CNF:
c    -b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨  b^{19, 24}_2
c    -b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_1
c    -b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨  b^{19, 24}_0
c  in DIMACS:
-13436 -13437  13438 -437  13439 0
-13436 -13437  13438 -437 -13440 0
-13436 -13437  13438 -437  13441 0

c  -1+1 --> 0
c    ( b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0 ∧  p_437) -> (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧ -b^{19, 24}_0)
c  in CNF:
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_2
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_1
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_0
c  in DIMACS:
-13436  13437 -13438 -437 -13439 0
-13436  13437 -13438 -437 -13440 0
-13436  13437 -13438 -437 -13441 0

c  0+1 --> 1
c    (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧  p_437) -> (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0)
c  in CNF:
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_2
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_1
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨  b^{19, 24}_0
c  in DIMACS:
 13436  13437  13438 -437 -13439 0
 13436  13437  13438 -437 -13440 0
 13436  13437  13438 -437  13441 0

c  1+1 --> 2
c    (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0 ∧  p_437) -> (-b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0)
c  in CNF:
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_2
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨  b^{19, 24}_1
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ -p_437 ∨ -b^{19, 24}_0
c  in DIMACS:
 13436  13437 -13438 -437 -13439 0
 13436  13437 -13438 -437  13440 0
 13436  13437 -13438 -437 -13441 0

c  2+1 --> break 
c    (-b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧  p_437) -> break
c  in CNF:
c     b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ -p_437 ∨ break
c  in DIMACS:
 13436 -13437  13438 -437 1162 0


c  2-1 --> 1
c    (-b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧ -p_437) -> (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0)
c  in CNF:
c     b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_2
c     b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_1
c     b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨  b^{19, 24}_0
c  in DIMACS:
 13436 -13437  13438  437 -13439 0
 13436 -13437  13438  437 -13440 0
 13436 -13437  13438  437  13441 0

c  1-1 --> 0
c    (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0 ∧ -p_437) -> (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧ -b^{19, 24}_0)
c  in CNF:
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_2
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_1
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_0
c  in DIMACS:
 13436  13437 -13438  437 -13439 0
 13436  13437 -13438  437 -13440 0
 13436  13437 -13438  437 -13441 0

c  0-1 --> -1
c    (-b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧ -p_437) -> ( b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0)
c  in CNF:
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨  b^{19, 24}_2
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_1
c     b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨  b^{19, 24}_0
c  in DIMACS:
 13436  13437  13438  437  13439 0
 13436  13437  13438  437 -13440 0
 13436  13437  13438  437  13441 0

c  -1-1 --> -2
c    ( b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧  b^{19, 23}_0 ∧ -p_437) -> ( b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0)
c  in CNF:
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨  b^{19, 24}_2
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨  b^{19, 24}_1
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨  p_437 ∨ -b^{19, 24}_0
c  in DIMACS:
-13436  13437 -13438  437  13439 0
-13436  13437 -13438  437  13440 0
-13436  13437 -13438  437 -13441 0

c  -2-1 --> break 
c    ( b^{19, 23}_2 ∧  b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧ -p_437) -> break
c  in CNF:
c    -b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨  b^{19, 23}_0 ∨  p_437 ∨ break
c  in DIMACS:
-13436 -13437  13438  437 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 23}_2 ∧ -b^{19, 23}_1 ∧ -b^{19, 23}_0 ∧ true) 
c  in CNF:
c    -b^{19, 23}_2 ∨  b^{19, 23}_1 ∨  b^{19, 23}_0 ∨ false 
c  in DIMACS:
-13436  13437  13438  0

c  3 does not represent an automaton state.
c    -(-b^{19, 23}_2 ∧  b^{19, 23}_1 ∧  b^{19, 23}_0 ∧ true) 
c  in CNF:
c     b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ false 
c  in DIMACS:
 13436 -13437 -13438  0
c  -3 does not represent an automaton state.
c    -( b^{19, 23}_2 ∧  b^{19, 23}_1 ∧  b^{19, 23}_0 ∧ true) 
c  in CNF:
c    -b^{19, 23}_2 ∨ -b^{19, 23}_1 ∨ -b^{19, 23}_0 ∨ false 
c  in DIMACS:
-13436 -13437 -13438  0

c i = 24
c  -2+1 --> -1
c    ( b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧  p_456) -> ( b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0)
c  in CNF:
c    -b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨  b^{19, 25}_2
c    -b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_1
c    -b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨  b^{19, 25}_0
c  in DIMACS:
-13439 -13440  13441 -456  13442 0
-13439 -13440  13441 -456 -13443 0
-13439 -13440  13441 -456  13444 0

c  -1+1 --> 0
c    ( b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0 ∧  p_456) -> (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧ -b^{19, 25}_0)
c  in CNF:
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_2
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_1
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_0
c  in DIMACS:
-13439  13440 -13441 -456 -13442 0
-13439  13440 -13441 -456 -13443 0
-13439  13440 -13441 -456 -13444 0

c  0+1 --> 1
c    (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧  p_456) -> (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0)
c  in CNF:
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_2
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_1
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨  b^{19, 25}_0
c  in DIMACS:
 13439  13440  13441 -456 -13442 0
 13439  13440  13441 -456 -13443 0
 13439  13440  13441 -456  13444 0

c  1+1 --> 2
c    (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0 ∧  p_456) -> (-b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0)
c  in CNF:
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_2
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨  b^{19, 25}_1
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ -p_456 ∨ -b^{19, 25}_0
c  in DIMACS:
 13439  13440 -13441 -456 -13442 0
 13439  13440 -13441 -456  13443 0
 13439  13440 -13441 -456 -13444 0

c  2+1 --> break 
c    (-b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧  p_456) -> break
c  in CNF:
c     b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 13439 -13440  13441 -456 1162 0


c  2-1 --> 1
c    (-b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧ -p_456) -> (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0)
c  in CNF:
c     b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_2
c     b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_1
c     b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨  b^{19, 25}_0
c  in DIMACS:
 13439 -13440  13441  456 -13442 0
 13439 -13440  13441  456 -13443 0
 13439 -13440  13441  456  13444 0

c  1-1 --> 0
c    (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0 ∧ -p_456) -> (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧ -b^{19, 25}_0)
c  in CNF:
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_2
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_1
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_0
c  in DIMACS:
 13439  13440 -13441  456 -13442 0
 13439  13440 -13441  456 -13443 0
 13439  13440 -13441  456 -13444 0

c  0-1 --> -1
c    (-b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧ -p_456) -> ( b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0)
c  in CNF:
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨  b^{19, 25}_2
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_1
c     b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨  b^{19, 25}_0
c  in DIMACS:
 13439  13440  13441  456  13442 0
 13439  13440  13441  456 -13443 0
 13439  13440  13441  456  13444 0

c  -1-1 --> -2
c    ( b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧  b^{19, 24}_0 ∧ -p_456) -> ( b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0)
c  in CNF:
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨  b^{19, 25}_2
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨  b^{19, 25}_1
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨  p_456 ∨ -b^{19, 25}_0
c  in DIMACS:
-13439  13440 -13441  456  13442 0
-13439  13440 -13441  456  13443 0
-13439  13440 -13441  456 -13444 0

c  -2-1 --> break 
c    ( b^{19, 24}_2 ∧  b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨  b^{19, 24}_0 ∨  p_456 ∨ break
c  in DIMACS:
-13439 -13440  13441  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 24}_2 ∧ -b^{19, 24}_1 ∧ -b^{19, 24}_0 ∧ true) 
c  in CNF:
c    -b^{19, 24}_2 ∨  b^{19, 24}_1 ∨  b^{19, 24}_0 ∨ false 
c  in DIMACS:
-13439  13440  13441  0

c  3 does not represent an automaton state.
c    -(-b^{19, 24}_2 ∧  b^{19, 24}_1 ∧  b^{19, 24}_0 ∧ true) 
c  in CNF:
c     b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ false 
c  in DIMACS:
 13439 -13440 -13441  0
c  -3 does not represent an automaton state.
c    -( b^{19, 24}_2 ∧  b^{19, 24}_1 ∧  b^{19, 24}_0 ∧ true) 
c  in CNF:
c    -b^{19, 24}_2 ∨ -b^{19, 24}_1 ∨ -b^{19, 24}_0 ∨ false 
c  in DIMACS:
-13439 -13440 -13441  0

c i = 25
c  -2+1 --> -1
c    ( b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧  p_475) -> ( b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0)
c  in CNF:
c    -b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨  b^{19, 26}_2
c    -b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_1
c    -b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨  b^{19, 26}_0
c  in DIMACS:
-13442 -13443  13444 -475  13445 0
-13442 -13443  13444 -475 -13446 0
-13442 -13443  13444 -475  13447 0

c  -1+1 --> 0
c    ( b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0 ∧  p_475) -> (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧ -b^{19, 26}_0)
c  in CNF:
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_2
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_1
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_0
c  in DIMACS:
-13442  13443 -13444 -475 -13445 0
-13442  13443 -13444 -475 -13446 0
-13442  13443 -13444 -475 -13447 0

c  0+1 --> 1
c    (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧  p_475) -> (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0)
c  in CNF:
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_2
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_1
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨  b^{19, 26}_0
c  in DIMACS:
 13442  13443  13444 -475 -13445 0
 13442  13443  13444 -475 -13446 0
 13442  13443  13444 -475  13447 0

c  1+1 --> 2
c    (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0 ∧  p_475) -> (-b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0)
c  in CNF:
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_2
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨  b^{19, 26}_1
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ -p_475 ∨ -b^{19, 26}_0
c  in DIMACS:
 13442  13443 -13444 -475 -13445 0
 13442  13443 -13444 -475  13446 0
 13442  13443 -13444 -475 -13447 0

c  2+1 --> break 
c    (-b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧  p_475) -> break
c  in CNF:
c     b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ -p_475 ∨ break
c  in DIMACS:
 13442 -13443  13444 -475 1162 0


c  2-1 --> 1
c    (-b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧ -p_475) -> (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0)
c  in CNF:
c     b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_2
c     b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_1
c     b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨  b^{19, 26}_0
c  in DIMACS:
 13442 -13443  13444  475 -13445 0
 13442 -13443  13444  475 -13446 0
 13442 -13443  13444  475  13447 0

c  1-1 --> 0
c    (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0 ∧ -p_475) -> (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧ -b^{19, 26}_0)
c  in CNF:
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_2
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_1
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_0
c  in DIMACS:
 13442  13443 -13444  475 -13445 0
 13442  13443 -13444  475 -13446 0
 13442  13443 -13444  475 -13447 0

c  0-1 --> -1
c    (-b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧ -p_475) -> ( b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0)
c  in CNF:
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨  b^{19, 26}_2
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_1
c     b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨  b^{19, 26}_0
c  in DIMACS:
 13442  13443  13444  475  13445 0
 13442  13443  13444  475 -13446 0
 13442  13443  13444  475  13447 0

c  -1-1 --> -2
c    ( b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧  b^{19, 25}_0 ∧ -p_475) -> ( b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0)
c  in CNF:
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨  b^{19, 26}_2
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨  b^{19, 26}_1
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨  p_475 ∨ -b^{19, 26}_0
c  in DIMACS:
-13442  13443 -13444  475  13445 0
-13442  13443 -13444  475  13446 0
-13442  13443 -13444  475 -13447 0

c  -2-1 --> break 
c    ( b^{19, 25}_2 ∧  b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧ -p_475) -> break
c  in CNF:
c    -b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨  b^{19, 25}_0 ∨  p_475 ∨ break
c  in DIMACS:
-13442 -13443  13444  475 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 25}_2 ∧ -b^{19, 25}_1 ∧ -b^{19, 25}_0 ∧ true) 
c  in CNF:
c    -b^{19, 25}_2 ∨  b^{19, 25}_1 ∨  b^{19, 25}_0 ∨ false 
c  in DIMACS:
-13442  13443  13444  0

c  3 does not represent an automaton state.
c    -(-b^{19, 25}_2 ∧  b^{19, 25}_1 ∧  b^{19, 25}_0 ∧ true) 
c  in CNF:
c     b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ false 
c  in DIMACS:
 13442 -13443 -13444  0
c  -3 does not represent an automaton state.
c    -( b^{19, 25}_2 ∧  b^{19, 25}_1 ∧  b^{19, 25}_0 ∧ true) 
c  in CNF:
c    -b^{19, 25}_2 ∨ -b^{19, 25}_1 ∨ -b^{19, 25}_0 ∨ false 
c  in DIMACS:
-13442 -13443 -13444  0

c i = 26
c  -2+1 --> -1
c    ( b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧  p_494) -> ( b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0)
c  in CNF:
c    -b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨  b^{19, 27}_2
c    -b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_1
c    -b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨  b^{19, 27}_0
c  in DIMACS:
-13445 -13446  13447 -494  13448 0
-13445 -13446  13447 -494 -13449 0
-13445 -13446  13447 -494  13450 0

c  -1+1 --> 0
c    ( b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0 ∧  p_494) -> (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧ -b^{19, 27}_0)
c  in CNF:
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_2
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_1
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_0
c  in DIMACS:
-13445  13446 -13447 -494 -13448 0
-13445  13446 -13447 -494 -13449 0
-13445  13446 -13447 -494 -13450 0

c  0+1 --> 1
c    (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧  p_494) -> (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0)
c  in CNF:
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_2
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_1
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨  b^{19, 27}_0
c  in DIMACS:
 13445  13446  13447 -494 -13448 0
 13445  13446  13447 -494 -13449 0
 13445  13446  13447 -494  13450 0

c  1+1 --> 2
c    (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0 ∧  p_494) -> (-b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0)
c  in CNF:
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_2
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨  b^{19, 27}_1
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ -p_494 ∨ -b^{19, 27}_0
c  in DIMACS:
 13445  13446 -13447 -494 -13448 0
 13445  13446 -13447 -494  13449 0
 13445  13446 -13447 -494 -13450 0

c  2+1 --> break 
c    (-b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧  p_494) -> break
c  in CNF:
c     b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 13445 -13446  13447 -494 1162 0


c  2-1 --> 1
c    (-b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧ -p_494) -> (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0)
c  in CNF:
c     b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_2
c     b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_1
c     b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨  b^{19, 27}_0
c  in DIMACS:
 13445 -13446  13447  494 -13448 0
 13445 -13446  13447  494 -13449 0
 13445 -13446  13447  494  13450 0

c  1-1 --> 0
c    (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0 ∧ -p_494) -> (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧ -b^{19, 27}_0)
c  in CNF:
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_2
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_1
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_0
c  in DIMACS:
 13445  13446 -13447  494 -13448 0
 13445  13446 -13447  494 -13449 0
 13445  13446 -13447  494 -13450 0

c  0-1 --> -1
c    (-b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧ -p_494) -> ( b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0)
c  in CNF:
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨  b^{19, 27}_2
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_1
c     b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨  b^{19, 27}_0
c  in DIMACS:
 13445  13446  13447  494  13448 0
 13445  13446  13447  494 -13449 0
 13445  13446  13447  494  13450 0

c  -1-1 --> -2
c    ( b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧  b^{19, 26}_0 ∧ -p_494) -> ( b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0)
c  in CNF:
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨  b^{19, 27}_2
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨  b^{19, 27}_1
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨  p_494 ∨ -b^{19, 27}_0
c  in DIMACS:
-13445  13446 -13447  494  13448 0
-13445  13446 -13447  494  13449 0
-13445  13446 -13447  494 -13450 0

c  -2-1 --> break 
c    ( b^{19, 26}_2 ∧  b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨  b^{19, 26}_0 ∨  p_494 ∨ break
c  in DIMACS:
-13445 -13446  13447  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 26}_2 ∧ -b^{19, 26}_1 ∧ -b^{19, 26}_0 ∧ true) 
c  in CNF:
c    -b^{19, 26}_2 ∨  b^{19, 26}_1 ∨  b^{19, 26}_0 ∨ false 
c  in DIMACS:
-13445  13446  13447  0

c  3 does not represent an automaton state.
c    -(-b^{19, 26}_2 ∧  b^{19, 26}_1 ∧  b^{19, 26}_0 ∧ true) 
c  in CNF:
c     b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ false 
c  in DIMACS:
 13445 -13446 -13447  0
c  -3 does not represent an automaton state.
c    -( b^{19, 26}_2 ∧  b^{19, 26}_1 ∧  b^{19, 26}_0 ∧ true) 
c  in CNF:
c    -b^{19, 26}_2 ∨ -b^{19, 26}_1 ∨ -b^{19, 26}_0 ∨ false 
c  in DIMACS:
-13445 -13446 -13447  0

c i = 27
c  -2+1 --> -1
c    ( b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧  p_513) -> ( b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0)
c  in CNF:
c    -b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨  b^{19, 28}_2
c    -b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_1
c    -b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨  b^{19, 28}_0
c  in DIMACS:
-13448 -13449  13450 -513  13451 0
-13448 -13449  13450 -513 -13452 0
-13448 -13449  13450 -513  13453 0

c  -1+1 --> 0
c    ( b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0 ∧  p_513) -> (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧ -b^{19, 28}_0)
c  in CNF:
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_2
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_1
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_0
c  in DIMACS:
-13448  13449 -13450 -513 -13451 0
-13448  13449 -13450 -513 -13452 0
-13448  13449 -13450 -513 -13453 0

c  0+1 --> 1
c    (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧  p_513) -> (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0)
c  in CNF:
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_2
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_1
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨  b^{19, 28}_0
c  in DIMACS:
 13448  13449  13450 -513 -13451 0
 13448  13449  13450 -513 -13452 0
 13448  13449  13450 -513  13453 0

c  1+1 --> 2
c    (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0 ∧  p_513) -> (-b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0)
c  in CNF:
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_2
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨  b^{19, 28}_1
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ -p_513 ∨ -b^{19, 28}_0
c  in DIMACS:
 13448  13449 -13450 -513 -13451 0
 13448  13449 -13450 -513  13452 0
 13448  13449 -13450 -513 -13453 0

c  2+1 --> break 
c    (-b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧  p_513) -> break
c  in CNF:
c     b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 13448 -13449  13450 -513 1162 0


c  2-1 --> 1
c    (-b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧ -p_513) -> (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0)
c  in CNF:
c     b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_2
c     b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_1
c     b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨  b^{19, 28}_0
c  in DIMACS:
 13448 -13449  13450  513 -13451 0
 13448 -13449  13450  513 -13452 0
 13448 -13449  13450  513  13453 0

c  1-1 --> 0
c    (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0 ∧ -p_513) -> (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧ -b^{19, 28}_0)
c  in CNF:
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_2
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_1
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_0
c  in DIMACS:
 13448  13449 -13450  513 -13451 0
 13448  13449 -13450  513 -13452 0
 13448  13449 -13450  513 -13453 0

c  0-1 --> -1
c    (-b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧ -p_513) -> ( b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0)
c  in CNF:
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨  b^{19, 28}_2
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_1
c     b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨  b^{19, 28}_0
c  in DIMACS:
 13448  13449  13450  513  13451 0
 13448  13449  13450  513 -13452 0
 13448  13449  13450  513  13453 0

c  -1-1 --> -2
c    ( b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧  b^{19, 27}_0 ∧ -p_513) -> ( b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0)
c  in CNF:
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨  b^{19, 28}_2
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨  b^{19, 28}_1
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨  p_513 ∨ -b^{19, 28}_0
c  in DIMACS:
-13448  13449 -13450  513  13451 0
-13448  13449 -13450  513  13452 0
-13448  13449 -13450  513 -13453 0

c  -2-1 --> break 
c    ( b^{19, 27}_2 ∧  b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨  b^{19, 27}_0 ∨  p_513 ∨ break
c  in DIMACS:
-13448 -13449  13450  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 27}_2 ∧ -b^{19, 27}_1 ∧ -b^{19, 27}_0 ∧ true) 
c  in CNF:
c    -b^{19, 27}_2 ∨  b^{19, 27}_1 ∨  b^{19, 27}_0 ∨ false 
c  in DIMACS:
-13448  13449  13450  0

c  3 does not represent an automaton state.
c    -(-b^{19, 27}_2 ∧  b^{19, 27}_1 ∧  b^{19, 27}_0 ∧ true) 
c  in CNF:
c     b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ false 
c  in DIMACS:
 13448 -13449 -13450  0
c  -3 does not represent an automaton state.
c    -( b^{19, 27}_2 ∧  b^{19, 27}_1 ∧  b^{19, 27}_0 ∧ true) 
c  in CNF:
c    -b^{19, 27}_2 ∨ -b^{19, 27}_1 ∨ -b^{19, 27}_0 ∨ false 
c  in DIMACS:
-13448 -13449 -13450  0

c i = 28
c  -2+1 --> -1
c    ( b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧  p_532) -> ( b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0)
c  in CNF:
c    -b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨  b^{19, 29}_2
c    -b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_1
c    -b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨  b^{19, 29}_0
c  in DIMACS:
-13451 -13452  13453 -532  13454 0
-13451 -13452  13453 -532 -13455 0
-13451 -13452  13453 -532  13456 0

c  -1+1 --> 0
c    ( b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0 ∧  p_532) -> (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧ -b^{19, 29}_0)
c  in CNF:
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_2
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_1
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_0
c  in DIMACS:
-13451  13452 -13453 -532 -13454 0
-13451  13452 -13453 -532 -13455 0
-13451  13452 -13453 -532 -13456 0

c  0+1 --> 1
c    (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧  p_532) -> (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0)
c  in CNF:
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_2
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_1
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨  b^{19, 29}_0
c  in DIMACS:
 13451  13452  13453 -532 -13454 0
 13451  13452  13453 -532 -13455 0
 13451  13452  13453 -532  13456 0

c  1+1 --> 2
c    (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0 ∧  p_532) -> (-b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0)
c  in CNF:
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_2
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨  b^{19, 29}_1
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ -p_532 ∨ -b^{19, 29}_0
c  in DIMACS:
 13451  13452 -13453 -532 -13454 0
 13451  13452 -13453 -532  13455 0
 13451  13452 -13453 -532 -13456 0

c  2+1 --> break 
c    (-b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧  p_532) -> break
c  in CNF:
c     b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 13451 -13452  13453 -532 1162 0


c  2-1 --> 1
c    (-b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧ -p_532) -> (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0)
c  in CNF:
c     b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_2
c     b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_1
c     b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨  b^{19, 29}_0
c  in DIMACS:
 13451 -13452  13453  532 -13454 0
 13451 -13452  13453  532 -13455 0
 13451 -13452  13453  532  13456 0

c  1-1 --> 0
c    (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0 ∧ -p_532) -> (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧ -b^{19, 29}_0)
c  in CNF:
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_2
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_1
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_0
c  in DIMACS:
 13451  13452 -13453  532 -13454 0
 13451  13452 -13453  532 -13455 0
 13451  13452 -13453  532 -13456 0

c  0-1 --> -1
c    (-b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧ -p_532) -> ( b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0)
c  in CNF:
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨  b^{19, 29}_2
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_1
c     b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨  b^{19, 29}_0
c  in DIMACS:
 13451  13452  13453  532  13454 0
 13451  13452  13453  532 -13455 0
 13451  13452  13453  532  13456 0

c  -1-1 --> -2
c    ( b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧  b^{19, 28}_0 ∧ -p_532) -> ( b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0)
c  in CNF:
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨  b^{19, 29}_2
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨  b^{19, 29}_1
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨  p_532 ∨ -b^{19, 29}_0
c  in DIMACS:
-13451  13452 -13453  532  13454 0
-13451  13452 -13453  532  13455 0
-13451  13452 -13453  532 -13456 0

c  -2-1 --> break 
c    ( b^{19, 28}_2 ∧  b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨  b^{19, 28}_0 ∨  p_532 ∨ break
c  in DIMACS:
-13451 -13452  13453  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 28}_2 ∧ -b^{19, 28}_1 ∧ -b^{19, 28}_0 ∧ true) 
c  in CNF:
c    -b^{19, 28}_2 ∨  b^{19, 28}_1 ∨  b^{19, 28}_0 ∨ false 
c  in DIMACS:
-13451  13452  13453  0

c  3 does not represent an automaton state.
c    -(-b^{19, 28}_2 ∧  b^{19, 28}_1 ∧  b^{19, 28}_0 ∧ true) 
c  in CNF:
c     b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ false 
c  in DIMACS:
 13451 -13452 -13453  0
c  -3 does not represent an automaton state.
c    -( b^{19, 28}_2 ∧  b^{19, 28}_1 ∧  b^{19, 28}_0 ∧ true) 
c  in CNF:
c    -b^{19, 28}_2 ∨ -b^{19, 28}_1 ∨ -b^{19, 28}_0 ∨ false 
c  in DIMACS:
-13451 -13452 -13453  0

c i = 29
c  -2+1 --> -1
c    ( b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧  p_551) -> ( b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0)
c  in CNF:
c    -b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨  b^{19, 30}_2
c    -b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_1
c    -b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨  b^{19, 30}_0
c  in DIMACS:
-13454 -13455  13456 -551  13457 0
-13454 -13455  13456 -551 -13458 0
-13454 -13455  13456 -551  13459 0

c  -1+1 --> 0
c    ( b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0 ∧  p_551) -> (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧ -b^{19, 30}_0)
c  in CNF:
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_2
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_1
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_0
c  in DIMACS:
-13454  13455 -13456 -551 -13457 0
-13454  13455 -13456 -551 -13458 0
-13454  13455 -13456 -551 -13459 0

c  0+1 --> 1
c    (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧  p_551) -> (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0)
c  in CNF:
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_2
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_1
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨  b^{19, 30}_0
c  in DIMACS:
 13454  13455  13456 -551 -13457 0
 13454  13455  13456 -551 -13458 0
 13454  13455  13456 -551  13459 0

c  1+1 --> 2
c    (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0 ∧  p_551) -> (-b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0)
c  in CNF:
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_2
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨  b^{19, 30}_1
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ -p_551 ∨ -b^{19, 30}_0
c  in DIMACS:
 13454  13455 -13456 -551 -13457 0
 13454  13455 -13456 -551  13458 0
 13454  13455 -13456 -551 -13459 0

c  2+1 --> break 
c    (-b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧  p_551) -> break
c  in CNF:
c     b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ -p_551 ∨ break
c  in DIMACS:
 13454 -13455  13456 -551 1162 0


c  2-1 --> 1
c    (-b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧ -p_551) -> (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0)
c  in CNF:
c     b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_2
c     b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_1
c     b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨  b^{19, 30}_0
c  in DIMACS:
 13454 -13455  13456  551 -13457 0
 13454 -13455  13456  551 -13458 0
 13454 -13455  13456  551  13459 0

c  1-1 --> 0
c    (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0 ∧ -p_551) -> (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧ -b^{19, 30}_0)
c  in CNF:
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_2
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_1
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_0
c  in DIMACS:
 13454  13455 -13456  551 -13457 0
 13454  13455 -13456  551 -13458 0
 13454  13455 -13456  551 -13459 0

c  0-1 --> -1
c    (-b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧ -p_551) -> ( b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0)
c  in CNF:
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨  b^{19, 30}_2
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_1
c     b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨  b^{19, 30}_0
c  in DIMACS:
 13454  13455  13456  551  13457 0
 13454  13455  13456  551 -13458 0
 13454  13455  13456  551  13459 0

c  -1-1 --> -2
c    ( b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧  b^{19, 29}_0 ∧ -p_551) -> ( b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0)
c  in CNF:
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨  b^{19, 30}_2
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨  b^{19, 30}_1
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨  p_551 ∨ -b^{19, 30}_0
c  in DIMACS:
-13454  13455 -13456  551  13457 0
-13454  13455 -13456  551  13458 0
-13454  13455 -13456  551 -13459 0

c  -2-1 --> break 
c    ( b^{19, 29}_2 ∧  b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧ -p_551) -> break
c  in CNF:
c    -b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨  b^{19, 29}_0 ∨  p_551 ∨ break
c  in DIMACS:
-13454 -13455  13456  551 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 29}_2 ∧ -b^{19, 29}_1 ∧ -b^{19, 29}_0 ∧ true) 
c  in CNF:
c    -b^{19, 29}_2 ∨  b^{19, 29}_1 ∨  b^{19, 29}_0 ∨ false 
c  in DIMACS:
-13454  13455  13456  0

c  3 does not represent an automaton state.
c    -(-b^{19, 29}_2 ∧  b^{19, 29}_1 ∧  b^{19, 29}_0 ∧ true) 
c  in CNF:
c     b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ false 
c  in DIMACS:
 13454 -13455 -13456  0
c  -3 does not represent an automaton state.
c    -( b^{19, 29}_2 ∧  b^{19, 29}_1 ∧  b^{19, 29}_0 ∧ true) 
c  in CNF:
c    -b^{19, 29}_2 ∨ -b^{19, 29}_1 ∨ -b^{19, 29}_0 ∨ false 
c  in DIMACS:
-13454 -13455 -13456  0

c i = 30
c  -2+1 --> -1
c    ( b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧  p_570) -> ( b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0)
c  in CNF:
c    -b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨  b^{19, 31}_2
c    -b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_1
c    -b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨  b^{19, 31}_0
c  in DIMACS:
-13457 -13458  13459 -570  13460 0
-13457 -13458  13459 -570 -13461 0
-13457 -13458  13459 -570  13462 0

c  -1+1 --> 0
c    ( b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0 ∧  p_570) -> (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧ -b^{19, 31}_0)
c  in CNF:
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_2
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_1
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_0
c  in DIMACS:
-13457  13458 -13459 -570 -13460 0
-13457  13458 -13459 -570 -13461 0
-13457  13458 -13459 -570 -13462 0

c  0+1 --> 1
c    (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧  p_570) -> (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0)
c  in CNF:
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_2
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_1
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨  b^{19, 31}_0
c  in DIMACS:
 13457  13458  13459 -570 -13460 0
 13457  13458  13459 -570 -13461 0
 13457  13458  13459 -570  13462 0

c  1+1 --> 2
c    (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0 ∧  p_570) -> (-b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0)
c  in CNF:
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_2
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨  b^{19, 31}_1
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ -p_570 ∨ -b^{19, 31}_0
c  in DIMACS:
 13457  13458 -13459 -570 -13460 0
 13457  13458 -13459 -570  13461 0
 13457  13458 -13459 -570 -13462 0

c  2+1 --> break 
c    (-b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧  p_570) -> break
c  in CNF:
c     b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 13457 -13458  13459 -570 1162 0


c  2-1 --> 1
c    (-b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧ -p_570) -> (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0)
c  in CNF:
c     b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_2
c     b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_1
c     b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨  b^{19, 31}_0
c  in DIMACS:
 13457 -13458  13459  570 -13460 0
 13457 -13458  13459  570 -13461 0
 13457 -13458  13459  570  13462 0

c  1-1 --> 0
c    (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0 ∧ -p_570) -> (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧ -b^{19, 31}_0)
c  in CNF:
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_2
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_1
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_0
c  in DIMACS:
 13457  13458 -13459  570 -13460 0
 13457  13458 -13459  570 -13461 0
 13457  13458 -13459  570 -13462 0

c  0-1 --> -1
c    (-b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧ -p_570) -> ( b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0)
c  in CNF:
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨  b^{19, 31}_2
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_1
c     b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨  b^{19, 31}_0
c  in DIMACS:
 13457  13458  13459  570  13460 0
 13457  13458  13459  570 -13461 0
 13457  13458  13459  570  13462 0

c  -1-1 --> -2
c    ( b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧  b^{19, 30}_0 ∧ -p_570) -> ( b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0)
c  in CNF:
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨  b^{19, 31}_2
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨  b^{19, 31}_1
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨  p_570 ∨ -b^{19, 31}_0
c  in DIMACS:
-13457  13458 -13459  570  13460 0
-13457  13458 -13459  570  13461 0
-13457  13458 -13459  570 -13462 0

c  -2-1 --> break 
c    ( b^{19, 30}_2 ∧  b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨  b^{19, 30}_0 ∨  p_570 ∨ break
c  in DIMACS:
-13457 -13458  13459  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 30}_2 ∧ -b^{19, 30}_1 ∧ -b^{19, 30}_0 ∧ true) 
c  in CNF:
c    -b^{19, 30}_2 ∨  b^{19, 30}_1 ∨  b^{19, 30}_0 ∨ false 
c  in DIMACS:
-13457  13458  13459  0

c  3 does not represent an automaton state.
c    -(-b^{19, 30}_2 ∧  b^{19, 30}_1 ∧  b^{19, 30}_0 ∧ true) 
c  in CNF:
c     b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ false 
c  in DIMACS:
 13457 -13458 -13459  0
c  -3 does not represent an automaton state.
c    -( b^{19, 30}_2 ∧  b^{19, 30}_1 ∧  b^{19, 30}_0 ∧ true) 
c  in CNF:
c    -b^{19, 30}_2 ∨ -b^{19, 30}_1 ∨ -b^{19, 30}_0 ∨ false 
c  in DIMACS:
-13457 -13458 -13459  0

c i = 31
c  -2+1 --> -1
c    ( b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧  p_589) -> ( b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0)
c  in CNF:
c    -b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨  b^{19, 32}_2
c    -b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_1
c    -b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨  b^{19, 32}_0
c  in DIMACS:
-13460 -13461  13462 -589  13463 0
-13460 -13461  13462 -589 -13464 0
-13460 -13461  13462 -589  13465 0

c  -1+1 --> 0
c    ( b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0 ∧  p_589) -> (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧ -b^{19, 32}_0)
c  in CNF:
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_2
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_1
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_0
c  in DIMACS:
-13460  13461 -13462 -589 -13463 0
-13460  13461 -13462 -589 -13464 0
-13460  13461 -13462 -589 -13465 0

c  0+1 --> 1
c    (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧  p_589) -> (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0)
c  in CNF:
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_2
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_1
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨  b^{19, 32}_0
c  in DIMACS:
 13460  13461  13462 -589 -13463 0
 13460  13461  13462 -589 -13464 0
 13460  13461  13462 -589  13465 0

c  1+1 --> 2
c    (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0 ∧  p_589) -> (-b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0)
c  in CNF:
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_2
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨  b^{19, 32}_1
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ -p_589 ∨ -b^{19, 32}_0
c  in DIMACS:
 13460  13461 -13462 -589 -13463 0
 13460  13461 -13462 -589  13464 0
 13460  13461 -13462 -589 -13465 0

c  2+1 --> break 
c    (-b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧  p_589) -> break
c  in CNF:
c     b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ -p_589 ∨ break
c  in DIMACS:
 13460 -13461  13462 -589 1162 0


c  2-1 --> 1
c    (-b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧ -p_589) -> (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0)
c  in CNF:
c     b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_2
c     b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_1
c     b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨  b^{19, 32}_0
c  in DIMACS:
 13460 -13461  13462  589 -13463 0
 13460 -13461  13462  589 -13464 0
 13460 -13461  13462  589  13465 0

c  1-1 --> 0
c    (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0 ∧ -p_589) -> (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧ -b^{19, 32}_0)
c  in CNF:
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_2
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_1
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_0
c  in DIMACS:
 13460  13461 -13462  589 -13463 0
 13460  13461 -13462  589 -13464 0
 13460  13461 -13462  589 -13465 0

c  0-1 --> -1
c    (-b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧ -p_589) -> ( b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0)
c  in CNF:
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨  b^{19, 32}_2
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_1
c     b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨  b^{19, 32}_0
c  in DIMACS:
 13460  13461  13462  589  13463 0
 13460  13461  13462  589 -13464 0
 13460  13461  13462  589  13465 0

c  -1-1 --> -2
c    ( b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧  b^{19, 31}_0 ∧ -p_589) -> ( b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0)
c  in CNF:
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨  b^{19, 32}_2
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨  b^{19, 32}_1
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨  p_589 ∨ -b^{19, 32}_0
c  in DIMACS:
-13460  13461 -13462  589  13463 0
-13460  13461 -13462  589  13464 0
-13460  13461 -13462  589 -13465 0

c  -2-1 --> break 
c    ( b^{19, 31}_2 ∧  b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧ -p_589) -> break
c  in CNF:
c    -b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨  b^{19, 31}_0 ∨  p_589 ∨ break
c  in DIMACS:
-13460 -13461  13462  589 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 31}_2 ∧ -b^{19, 31}_1 ∧ -b^{19, 31}_0 ∧ true) 
c  in CNF:
c    -b^{19, 31}_2 ∨  b^{19, 31}_1 ∨  b^{19, 31}_0 ∨ false 
c  in DIMACS:
-13460  13461  13462  0

c  3 does not represent an automaton state.
c    -(-b^{19, 31}_2 ∧  b^{19, 31}_1 ∧  b^{19, 31}_0 ∧ true) 
c  in CNF:
c     b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ false 
c  in DIMACS:
 13460 -13461 -13462  0
c  -3 does not represent an automaton state.
c    -( b^{19, 31}_2 ∧  b^{19, 31}_1 ∧  b^{19, 31}_0 ∧ true) 
c  in CNF:
c    -b^{19, 31}_2 ∨ -b^{19, 31}_1 ∨ -b^{19, 31}_0 ∨ false 
c  in DIMACS:
-13460 -13461 -13462  0

c i = 32
c  -2+1 --> -1
c    ( b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧  p_608) -> ( b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0)
c  in CNF:
c    -b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨  b^{19, 33}_2
c    -b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_1
c    -b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨  b^{19, 33}_0
c  in DIMACS:
-13463 -13464  13465 -608  13466 0
-13463 -13464  13465 -608 -13467 0
-13463 -13464  13465 -608  13468 0

c  -1+1 --> 0
c    ( b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0 ∧  p_608) -> (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧ -b^{19, 33}_0)
c  in CNF:
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_2
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_1
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_0
c  in DIMACS:
-13463  13464 -13465 -608 -13466 0
-13463  13464 -13465 -608 -13467 0
-13463  13464 -13465 -608 -13468 0

c  0+1 --> 1
c    (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧  p_608) -> (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0)
c  in CNF:
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_2
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_1
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨  b^{19, 33}_0
c  in DIMACS:
 13463  13464  13465 -608 -13466 0
 13463  13464  13465 -608 -13467 0
 13463  13464  13465 -608  13468 0

c  1+1 --> 2
c    (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0 ∧  p_608) -> (-b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0)
c  in CNF:
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_2
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨  b^{19, 33}_1
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ -p_608 ∨ -b^{19, 33}_0
c  in DIMACS:
 13463  13464 -13465 -608 -13466 0
 13463  13464 -13465 -608  13467 0
 13463  13464 -13465 -608 -13468 0

c  2+1 --> break 
c    (-b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧  p_608) -> break
c  in CNF:
c     b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 13463 -13464  13465 -608 1162 0


c  2-1 --> 1
c    (-b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧ -p_608) -> (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0)
c  in CNF:
c     b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_2
c     b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_1
c     b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨  b^{19, 33}_0
c  in DIMACS:
 13463 -13464  13465  608 -13466 0
 13463 -13464  13465  608 -13467 0
 13463 -13464  13465  608  13468 0

c  1-1 --> 0
c    (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0 ∧ -p_608) -> (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧ -b^{19, 33}_0)
c  in CNF:
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_2
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_1
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_0
c  in DIMACS:
 13463  13464 -13465  608 -13466 0
 13463  13464 -13465  608 -13467 0
 13463  13464 -13465  608 -13468 0

c  0-1 --> -1
c    (-b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧ -p_608) -> ( b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0)
c  in CNF:
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨  b^{19, 33}_2
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_1
c     b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨  b^{19, 33}_0
c  in DIMACS:
 13463  13464  13465  608  13466 0
 13463  13464  13465  608 -13467 0
 13463  13464  13465  608  13468 0

c  -1-1 --> -2
c    ( b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧  b^{19, 32}_0 ∧ -p_608) -> ( b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0)
c  in CNF:
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨  b^{19, 33}_2
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨  b^{19, 33}_1
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨  p_608 ∨ -b^{19, 33}_0
c  in DIMACS:
-13463  13464 -13465  608  13466 0
-13463  13464 -13465  608  13467 0
-13463  13464 -13465  608 -13468 0

c  -2-1 --> break 
c    ( b^{19, 32}_2 ∧  b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨  b^{19, 32}_0 ∨  p_608 ∨ break
c  in DIMACS:
-13463 -13464  13465  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 32}_2 ∧ -b^{19, 32}_1 ∧ -b^{19, 32}_0 ∧ true) 
c  in CNF:
c    -b^{19, 32}_2 ∨  b^{19, 32}_1 ∨  b^{19, 32}_0 ∨ false 
c  in DIMACS:
-13463  13464  13465  0

c  3 does not represent an automaton state.
c    -(-b^{19, 32}_2 ∧  b^{19, 32}_1 ∧  b^{19, 32}_0 ∧ true) 
c  in CNF:
c     b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ false 
c  in DIMACS:
 13463 -13464 -13465  0
c  -3 does not represent an automaton state.
c    -( b^{19, 32}_2 ∧  b^{19, 32}_1 ∧  b^{19, 32}_0 ∧ true) 
c  in CNF:
c    -b^{19, 32}_2 ∨ -b^{19, 32}_1 ∨ -b^{19, 32}_0 ∨ false 
c  in DIMACS:
-13463 -13464 -13465  0

c i = 33
c  -2+1 --> -1
c    ( b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧  p_627) -> ( b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0)
c  in CNF:
c    -b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨  b^{19, 34}_2
c    -b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_1
c    -b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨  b^{19, 34}_0
c  in DIMACS:
-13466 -13467  13468 -627  13469 0
-13466 -13467  13468 -627 -13470 0
-13466 -13467  13468 -627  13471 0

c  -1+1 --> 0
c    ( b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0 ∧  p_627) -> (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧ -b^{19, 34}_0)
c  in CNF:
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_2
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_1
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_0
c  in DIMACS:
-13466  13467 -13468 -627 -13469 0
-13466  13467 -13468 -627 -13470 0
-13466  13467 -13468 -627 -13471 0

c  0+1 --> 1
c    (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧  p_627) -> (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0)
c  in CNF:
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_2
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_1
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨  b^{19, 34}_0
c  in DIMACS:
 13466  13467  13468 -627 -13469 0
 13466  13467  13468 -627 -13470 0
 13466  13467  13468 -627  13471 0

c  1+1 --> 2
c    (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0 ∧  p_627) -> (-b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0)
c  in CNF:
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_2
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨  b^{19, 34}_1
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ -p_627 ∨ -b^{19, 34}_0
c  in DIMACS:
 13466  13467 -13468 -627 -13469 0
 13466  13467 -13468 -627  13470 0
 13466  13467 -13468 -627 -13471 0

c  2+1 --> break 
c    (-b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧  p_627) -> break
c  in CNF:
c     b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 13466 -13467  13468 -627 1162 0


c  2-1 --> 1
c    (-b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧ -p_627) -> (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0)
c  in CNF:
c     b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_2
c     b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_1
c     b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨  b^{19, 34}_0
c  in DIMACS:
 13466 -13467  13468  627 -13469 0
 13466 -13467  13468  627 -13470 0
 13466 -13467  13468  627  13471 0

c  1-1 --> 0
c    (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0 ∧ -p_627) -> (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧ -b^{19, 34}_0)
c  in CNF:
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_2
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_1
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_0
c  in DIMACS:
 13466  13467 -13468  627 -13469 0
 13466  13467 -13468  627 -13470 0
 13466  13467 -13468  627 -13471 0

c  0-1 --> -1
c    (-b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧ -p_627) -> ( b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0)
c  in CNF:
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨  b^{19, 34}_2
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_1
c     b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨  b^{19, 34}_0
c  in DIMACS:
 13466  13467  13468  627  13469 0
 13466  13467  13468  627 -13470 0
 13466  13467  13468  627  13471 0

c  -1-1 --> -2
c    ( b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧  b^{19, 33}_0 ∧ -p_627) -> ( b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0)
c  in CNF:
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨  b^{19, 34}_2
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨  b^{19, 34}_1
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨  p_627 ∨ -b^{19, 34}_0
c  in DIMACS:
-13466  13467 -13468  627  13469 0
-13466  13467 -13468  627  13470 0
-13466  13467 -13468  627 -13471 0

c  -2-1 --> break 
c    ( b^{19, 33}_2 ∧  b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨  b^{19, 33}_0 ∨  p_627 ∨ break
c  in DIMACS:
-13466 -13467  13468  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 33}_2 ∧ -b^{19, 33}_1 ∧ -b^{19, 33}_0 ∧ true) 
c  in CNF:
c    -b^{19, 33}_2 ∨  b^{19, 33}_1 ∨  b^{19, 33}_0 ∨ false 
c  in DIMACS:
-13466  13467  13468  0

c  3 does not represent an automaton state.
c    -(-b^{19, 33}_2 ∧  b^{19, 33}_1 ∧  b^{19, 33}_0 ∧ true) 
c  in CNF:
c     b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ false 
c  in DIMACS:
 13466 -13467 -13468  0
c  -3 does not represent an automaton state.
c    -( b^{19, 33}_2 ∧  b^{19, 33}_1 ∧  b^{19, 33}_0 ∧ true) 
c  in CNF:
c    -b^{19, 33}_2 ∨ -b^{19, 33}_1 ∨ -b^{19, 33}_0 ∨ false 
c  in DIMACS:
-13466 -13467 -13468  0

c i = 34
c  -2+1 --> -1
c    ( b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧  p_646) -> ( b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0)
c  in CNF:
c    -b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨  b^{19, 35}_2
c    -b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_1
c    -b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨  b^{19, 35}_0
c  in DIMACS:
-13469 -13470  13471 -646  13472 0
-13469 -13470  13471 -646 -13473 0
-13469 -13470  13471 -646  13474 0

c  -1+1 --> 0
c    ( b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0 ∧  p_646) -> (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧ -b^{19, 35}_0)
c  in CNF:
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_2
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_1
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_0
c  in DIMACS:
-13469  13470 -13471 -646 -13472 0
-13469  13470 -13471 -646 -13473 0
-13469  13470 -13471 -646 -13474 0

c  0+1 --> 1
c    (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧  p_646) -> (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0)
c  in CNF:
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_2
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_1
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨  b^{19, 35}_0
c  in DIMACS:
 13469  13470  13471 -646 -13472 0
 13469  13470  13471 -646 -13473 0
 13469  13470  13471 -646  13474 0

c  1+1 --> 2
c    (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0 ∧  p_646) -> (-b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0)
c  in CNF:
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_2
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨  b^{19, 35}_1
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ -p_646 ∨ -b^{19, 35}_0
c  in DIMACS:
 13469  13470 -13471 -646 -13472 0
 13469  13470 -13471 -646  13473 0
 13469  13470 -13471 -646 -13474 0

c  2+1 --> break 
c    (-b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧  p_646) -> break
c  in CNF:
c     b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 13469 -13470  13471 -646 1162 0


c  2-1 --> 1
c    (-b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧ -p_646) -> (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0)
c  in CNF:
c     b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_2
c     b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_1
c     b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨  b^{19, 35}_0
c  in DIMACS:
 13469 -13470  13471  646 -13472 0
 13469 -13470  13471  646 -13473 0
 13469 -13470  13471  646  13474 0

c  1-1 --> 0
c    (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0 ∧ -p_646) -> (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧ -b^{19, 35}_0)
c  in CNF:
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_2
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_1
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_0
c  in DIMACS:
 13469  13470 -13471  646 -13472 0
 13469  13470 -13471  646 -13473 0
 13469  13470 -13471  646 -13474 0

c  0-1 --> -1
c    (-b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧ -p_646) -> ( b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0)
c  in CNF:
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨  b^{19, 35}_2
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_1
c     b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨  b^{19, 35}_0
c  in DIMACS:
 13469  13470  13471  646  13472 0
 13469  13470  13471  646 -13473 0
 13469  13470  13471  646  13474 0

c  -1-1 --> -2
c    ( b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧  b^{19, 34}_0 ∧ -p_646) -> ( b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0)
c  in CNF:
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨  b^{19, 35}_2
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨  b^{19, 35}_1
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨  p_646 ∨ -b^{19, 35}_0
c  in DIMACS:
-13469  13470 -13471  646  13472 0
-13469  13470 -13471  646  13473 0
-13469  13470 -13471  646 -13474 0

c  -2-1 --> break 
c    ( b^{19, 34}_2 ∧  b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨  b^{19, 34}_0 ∨  p_646 ∨ break
c  in DIMACS:
-13469 -13470  13471  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 34}_2 ∧ -b^{19, 34}_1 ∧ -b^{19, 34}_0 ∧ true) 
c  in CNF:
c    -b^{19, 34}_2 ∨  b^{19, 34}_1 ∨  b^{19, 34}_0 ∨ false 
c  in DIMACS:
-13469  13470  13471  0

c  3 does not represent an automaton state.
c    -(-b^{19, 34}_2 ∧  b^{19, 34}_1 ∧  b^{19, 34}_0 ∧ true) 
c  in CNF:
c     b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ false 
c  in DIMACS:
 13469 -13470 -13471  0
c  -3 does not represent an automaton state.
c    -( b^{19, 34}_2 ∧  b^{19, 34}_1 ∧  b^{19, 34}_0 ∧ true) 
c  in CNF:
c    -b^{19, 34}_2 ∨ -b^{19, 34}_1 ∨ -b^{19, 34}_0 ∨ false 
c  in DIMACS:
-13469 -13470 -13471  0

c i = 35
c  -2+1 --> -1
c    ( b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧  p_665) -> ( b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0)
c  in CNF:
c    -b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨  b^{19, 36}_2
c    -b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_1
c    -b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨  b^{19, 36}_0
c  in DIMACS:
-13472 -13473  13474 -665  13475 0
-13472 -13473  13474 -665 -13476 0
-13472 -13473  13474 -665  13477 0

c  -1+1 --> 0
c    ( b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0 ∧  p_665) -> (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧ -b^{19, 36}_0)
c  in CNF:
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_2
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_1
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_0
c  in DIMACS:
-13472  13473 -13474 -665 -13475 0
-13472  13473 -13474 -665 -13476 0
-13472  13473 -13474 -665 -13477 0

c  0+1 --> 1
c    (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧  p_665) -> (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0)
c  in CNF:
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_2
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_1
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨  b^{19, 36}_0
c  in DIMACS:
 13472  13473  13474 -665 -13475 0
 13472  13473  13474 -665 -13476 0
 13472  13473  13474 -665  13477 0

c  1+1 --> 2
c    (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0 ∧  p_665) -> (-b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0)
c  in CNF:
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_2
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨  b^{19, 36}_1
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ -p_665 ∨ -b^{19, 36}_0
c  in DIMACS:
 13472  13473 -13474 -665 -13475 0
 13472  13473 -13474 -665  13476 0
 13472  13473 -13474 -665 -13477 0

c  2+1 --> break 
c    (-b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧  p_665) -> break
c  in CNF:
c     b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 13472 -13473  13474 -665 1162 0


c  2-1 --> 1
c    (-b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧ -p_665) -> (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0)
c  in CNF:
c     b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_2
c     b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_1
c     b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨  b^{19, 36}_0
c  in DIMACS:
 13472 -13473  13474  665 -13475 0
 13472 -13473  13474  665 -13476 0
 13472 -13473  13474  665  13477 0

c  1-1 --> 0
c    (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0 ∧ -p_665) -> (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧ -b^{19, 36}_0)
c  in CNF:
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_2
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_1
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_0
c  in DIMACS:
 13472  13473 -13474  665 -13475 0
 13472  13473 -13474  665 -13476 0
 13472  13473 -13474  665 -13477 0

c  0-1 --> -1
c    (-b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧ -p_665) -> ( b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0)
c  in CNF:
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨  b^{19, 36}_2
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_1
c     b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨  b^{19, 36}_0
c  in DIMACS:
 13472  13473  13474  665  13475 0
 13472  13473  13474  665 -13476 0
 13472  13473  13474  665  13477 0

c  -1-1 --> -2
c    ( b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧  b^{19, 35}_0 ∧ -p_665) -> ( b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0)
c  in CNF:
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨  b^{19, 36}_2
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨  b^{19, 36}_1
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨  p_665 ∨ -b^{19, 36}_0
c  in DIMACS:
-13472  13473 -13474  665  13475 0
-13472  13473 -13474  665  13476 0
-13472  13473 -13474  665 -13477 0

c  -2-1 --> break 
c    ( b^{19, 35}_2 ∧  b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨  b^{19, 35}_0 ∨  p_665 ∨ break
c  in DIMACS:
-13472 -13473  13474  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 35}_2 ∧ -b^{19, 35}_1 ∧ -b^{19, 35}_0 ∧ true) 
c  in CNF:
c    -b^{19, 35}_2 ∨  b^{19, 35}_1 ∨  b^{19, 35}_0 ∨ false 
c  in DIMACS:
-13472  13473  13474  0

c  3 does not represent an automaton state.
c    -(-b^{19, 35}_2 ∧  b^{19, 35}_1 ∧  b^{19, 35}_0 ∧ true) 
c  in CNF:
c     b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ false 
c  in DIMACS:
 13472 -13473 -13474  0
c  -3 does not represent an automaton state.
c    -( b^{19, 35}_2 ∧  b^{19, 35}_1 ∧  b^{19, 35}_0 ∧ true) 
c  in CNF:
c    -b^{19, 35}_2 ∨ -b^{19, 35}_1 ∨ -b^{19, 35}_0 ∨ false 
c  in DIMACS:
-13472 -13473 -13474  0

c i = 36
c  -2+1 --> -1
c    ( b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧  p_684) -> ( b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0)
c  in CNF:
c    -b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨  b^{19, 37}_2
c    -b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_1
c    -b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨  b^{19, 37}_0
c  in DIMACS:
-13475 -13476  13477 -684  13478 0
-13475 -13476  13477 -684 -13479 0
-13475 -13476  13477 -684  13480 0

c  -1+1 --> 0
c    ( b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0 ∧  p_684) -> (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧ -b^{19, 37}_0)
c  in CNF:
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_2
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_1
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_0
c  in DIMACS:
-13475  13476 -13477 -684 -13478 0
-13475  13476 -13477 -684 -13479 0
-13475  13476 -13477 -684 -13480 0

c  0+1 --> 1
c    (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧  p_684) -> (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0)
c  in CNF:
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_2
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_1
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨  b^{19, 37}_0
c  in DIMACS:
 13475  13476  13477 -684 -13478 0
 13475  13476  13477 -684 -13479 0
 13475  13476  13477 -684  13480 0

c  1+1 --> 2
c    (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0 ∧  p_684) -> (-b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0)
c  in CNF:
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_2
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨  b^{19, 37}_1
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ -p_684 ∨ -b^{19, 37}_0
c  in DIMACS:
 13475  13476 -13477 -684 -13478 0
 13475  13476 -13477 -684  13479 0
 13475  13476 -13477 -684 -13480 0

c  2+1 --> break 
c    (-b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧  p_684) -> break
c  in CNF:
c     b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 13475 -13476  13477 -684 1162 0


c  2-1 --> 1
c    (-b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧ -p_684) -> (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0)
c  in CNF:
c     b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_2
c     b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_1
c     b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨  b^{19, 37}_0
c  in DIMACS:
 13475 -13476  13477  684 -13478 0
 13475 -13476  13477  684 -13479 0
 13475 -13476  13477  684  13480 0

c  1-1 --> 0
c    (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0 ∧ -p_684) -> (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧ -b^{19, 37}_0)
c  in CNF:
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_2
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_1
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_0
c  in DIMACS:
 13475  13476 -13477  684 -13478 0
 13475  13476 -13477  684 -13479 0
 13475  13476 -13477  684 -13480 0

c  0-1 --> -1
c    (-b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧ -p_684) -> ( b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0)
c  in CNF:
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨  b^{19, 37}_2
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_1
c     b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨  b^{19, 37}_0
c  in DIMACS:
 13475  13476  13477  684  13478 0
 13475  13476  13477  684 -13479 0
 13475  13476  13477  684  13480 0

c  -1-1 --> -2
c    ( b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧  b^{19, 36}_0 ∧ -p_684) -> ( b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0)
c  in CNF:
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨  b^{19, 37}_2
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨  b^{19, 37}_1
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨  p_684 ∨ -b^{19, 37}_0
c  in DIMACS:
-13475  13476 -13477  684  13478 0
-13475  13476 -13477  684  13479 0
-13475  13476 -13477  684 -13480 0

c  -2-1 --> break 
c    ( b^{19, 36}_2 ∧  b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨  b^{19, 36}_0 ∨  p_684 ∨ break
c  in DIMACS:
-13475 -13476  13477  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 36}_2 ∧ -b^{19, 36}_1 ∧ -b^{19, 36}_0 ∧ true) 
c  in CNF:
c    -b^{19, 36}_2 ∨  b^{19, 36}_1 ∨  b^{19, 36}_0 ∨ false 
c  in DIMACS:
-13475  13476  13477  0

c  3 does not represent an automaton state.
c    -(-b^{19, 36}_2 ∧  b^{19, 36}_1 ∧  b^{19, 36}_0 ∧ true) 
c  in CNF:
c     b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ false 
c  in DIMACS:
 13475 -13476 -13477  0
c  -3 does not represent an automaton state.
c    -( b^{19, 36}_2 ∧  b^{19, 36}_1 ∧  b^{19, 36}_0 ∧ true) 
c  in CNF:
c    -b^{19, 36}_2 ∨ -b^{19, 36}_1 ∨ -b^{19, 36}_0 ∨ false 
c  in DIMACS:
-13475 -13476 -13477  0

c i = 37
c  -2+1 --> -1
c    ( b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧  p_703) -> ( b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0)
c  in CNF:
c    -b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨  b^{19, 38}_2
c    -b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_1
c    -b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨  b^{19, 38}_0
c  in DIMACS:
-13478 -13479  13480 -703  13481 0
-13478 -13479  13480 -703 -13482 0
-13478 -13479  13480 -703  13483 0

c  -1+1 --> 0
c    ( b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0 ∧  p_703) -> (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧ -b^{19, 38}_0)
c  in CNF:
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_2
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_1
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_0
c  in DIMACS:
-13478  13479 -13480 -703 -13481 0
-13478  13479 -13480 -703 -13482 0
-13478  13479 -13480 -703 -13483 0

c  0+1 --> 1
c    (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧  p_703) -> (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0)
c  in CNF:
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_2
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_1
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨  b^{19, 38}_0
c  in DIMACS:
 13478  13479  13480 -703 -13481 0
 13478  13479  13480 -703 -13482 0
 13478  13479  13480 -703  13483 0

c  1+1 --> 2
c    (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0 ∧  p_703) -> (-b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0)
c  in CNF:
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_2
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨  b^{19, 38}_1
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ -p_703 ∨ -b^{19, 38}_0
c  in DIMACS:
 13478  13479 -13480 -703 -13481 0
 13478  13479 -13480 -703  13482 0
 13478  13479 -13480 -703 -13483 0

c  2+1 --> break 
c    (-b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧  p_703) -> break
c  in CNF:
c     b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ -p_703 ∨ break
c  in DIMACS:
 13478 -13479  13480 -703 1162 0


c  2-1 --> 1
c    (-b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧ -p_703) -> (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0)
c  in CNF:
c     b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_2
c     b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_1
c     b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨  b^{19, 38}_0
c  in DIMACS:
 13478 -13479  13480  703 -13481 0
 13478 -13479  13480  703 -13482 0
 13478 -13479  13480  703  13483 0

c  1-1 --> 0
c    (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0 ∧ -p_703) -> (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧ -b^{19, 38}_0)
c  in CNF:
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_2
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_1
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_0
c  in DIMACS:
 13478  13479 -13480  703 -13481 0
 13478  13479 -13480  703 -13482 0
 13478  13479 -13480  703 -13483 0

c  0-1 --> -1
c    (-b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧ -p_703) -> ( b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0)
c  in CNF:
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨  b^{19, 38}_2
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_1
c     b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨  b^{19, 38}_0
c  in DIMACS:
 13478  13479  13480  703  13481 0
 13478  13479  13480  703 -13482 0
 13478  13479  13480  703  13483 0

c  -1-1 --> -2
c    ( b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧  b^{19, 37}_0 ∧ -p_703) -> ( b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0)
c  in CNF:
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨  b^{19, 38}_2
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨  b^{19, 38}_1
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨  p_703 ∨ -b^{19, 38}_0
c  in DIMACS:
-13478  13479 -13480  703  13481 0
-13478  13479 -13480  703  13482 0
-13478  13479 -13480  703 -13483 0

c  -2-1 --> break 
c    ( b^{19, 37}_2 ∧  b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧ -p_703) -> break
c  in CNF:
c    -b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨  b^{19, 37}_0 ∨  p_703 ∨ break
c  in DIMACS:
-13478 -13479  13480  703 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 37}_2 ∧ -b^{19, 37}_1 ∧ -b^{19, 37}_0 ∧ true) 
c  in CNF:
c    -b^{19, 37}_2 ∨  b^{19, 37}_1 ∨  b^{19, 37}_0 ∨ false 
c  in DIMACS:
-13478  13479  13480  0

c  3 does not represent an automaton state.
c    -(-b^{19, 37}_2 ∧  b^{19, 37}_1 ∧  b^{19, 37}_0 ∧ true) 
c  in CNF:
c     b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ false 
c  in DIMACS:
 13478 -13479 -13480  0
c  -3 does not represent an automaton state.
c    -( b^{19, 37}_2 ∧  b^{19, 37}_1 ∧  b^{19, 37}_0 ∧ true) 
c  in CNF:
c    -b^{19, 37}_2 ∨ -b^{19, 37}_1 ∨ -b^{19, 37}_0 ∨ false 
c  in DIMACS:
-13478 -13479 -13480  0

c i = 38
c  -2+1 --> -1
c    ( b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧  p_722) -> ( b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0)
c  in CNF:
c    -b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨  b^{19, 39}_2
c    -b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_1
c    -b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨  b^{19, 39}_0
c  in DIMACS:
-13481 -13482  13483 -722  13484 0
-13481 -13482  13483 -722 -13485 0
-13481 -13482  13483 -722  13486 0

c  -1+1 --> 0
c    ( b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0 ∧  p_722) -> (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧ -b^{19, 39}_0)
c  in CNF:
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_2
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_1
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_0
c  in DIMACS:
-13481  13482 -13483 -722 -13484 0
-13481  13482 -13483 -722 -13485 0
-13481  13482 -13483 -722 -13486 0

c  0+1 --> 1
c    (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧  p_722) -> (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0)
c  in CNF:
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_2
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_1
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨  b^{19, 39}_0
c  in DIMACS:
 13481  13482  13483 -722 -13484 0
 13481  13482  13483 -722 -13485 0
 13481  13482  13483 -722  13486 0

c  1+1 --> 2
c    (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0 ∧  p_722) -> (-b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0)
c  in CNF:
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_2
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨  b^{19, 39}_1
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ -p_722 ∨ -b^{19, 39}_0
c  in DIMACS:
 13481  13482 -13483 -722 -13484 0
 13481  13482 -13483 -722  13485 0
 13481  13482 -13483 -722 -13486 0

c  2+1 --> break 
c    (-b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧  p_722) -> break
c  in CNF:
c     b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ -p_722 ∨ break
c  in DIMACS:
 13481 -13482  13483 -722 1162 0


c  2-1 --> 1
c    (-b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧ -p_722) -> (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0)
c  in CNF:
c     b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_2
c     b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_1
c     b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨  b^{19, 39}_0
c  in DIMACS:
 13481 -13482  13483  722 -13484 0
 13481 -13482  13483  722 -13485 0
 13481 -13482  13483  722  13486 0

c  1-1 --> 0
c    (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0 ∧ -p_722) -> (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧ -b^{19, 39}_0)
c  in CNF:
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_2
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_1
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_0
c  in DIMACS:
 13481  13482 -13483  722 -13484 0
 13481  13482 -13483  722 -13485 0
 13481  13482 -13483  722 -13486 0

c  0-1 --> -1
c    (-b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧ -p_722) -> ( b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0)
c  in CNF:
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨  b^{19, 39}_2
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_1
c     b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨  b^{19, 39}_0
c  in DIMACS:
 13481  13482  13483  722  13484 0
 13481  13482  13483  722 -13485 0
 13481  13482  13483  722  13486 0

c  -1-1 --> -2
c    ( b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧  b^{19, 38}_0 ∧ -p_722) -> ( b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0)
c  in CNF:
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨  b^{19, 39}_2
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨  b^{19, 39}_1
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨  p_722 ∨ -b^{19, 39}_0
c  in DIMACS:
-13481  13482 -13483  722  13484 0
-13481  13482 -13483  722  13485 0
-13481  13482 -13483  722 -13486 0

c  -2-1 --> break 
c    ( b^{19, 38}_2 ∧  b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧ -p_722) -> break
c  in CNF:
c    -b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨  b^{19, 38}_0 ∨  p_722 ∨ break
c  in DIMACS:
-13481 -13482  13483  722 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 38}_2 ∧ -b^{19, 38}_1 ∧ -b^{19, 38}_0 ∧ true) 
c  in CNF:
c    -b^{19, 38}_2 ∨  b^{19, 38}_1 ∨  b^{19, 38}_0 ∨ false 
c  in DIMACS:
-13481  13482  13483  0

c  3 does not represent an automaton state.
c    -(-b^{19, 38}_2 ∧  b^{19, 38}_1 ∧  b^{19, 38}_0 ∧ true) 
c  in CNF:
c     b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ false 
c  in DIMACS:
 13481 -13482 -13483  0
c  -3 does not represent an automaton state.
c    -( b^{19, 38}_2 ∧  b^{19, 38}_1 ∧  b^{19, 38}_0 ∧ true) 
c  in CNF:
c    -b^{19, 38}_2 ∨ -b^{19, 38}_1 ∨ -b^{19, 38}_0 ∨ false 
c  in DIMACS:
-13481 -13482 -13483  0

c i = 39
c  -2+1 --> -1
c    ( b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧  p_741) -> ( b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0)
c  in CNF:
c    -b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨  b^{19, 40}_2
c    -b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_1
c    -b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨  b^{19, 40}_0
c  in DIMACS:
-13484 -13485  13486 -741  13487 0
-13484 -13485  13486 -741 -13488 0
-13484 -13485  13486 -741  13489 0

c  -1+1 --> 0
c    ( b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0 ∧  p_741) -> (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧ -b^{19, 40}_0)
c  in CNF:
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_2
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_1
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_0
c  in DIMACS:
-13484  13485 -13486 -741 -13487 0
-13484  13485 -13486 -741 -13488 0
-13484  13485 -13486 -741 -13489 0

c  0+1 --> 1
c    (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧  p_741) -> (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0)
c  in CNF:
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_2
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_1
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨  b^{19, 40}_0
c  in DIMACS:
 13484  13485  13486 -741 -13487 0
 13484  13485  13486 -741 -13488 0
 13484  13485  13486 -741  13489 0

c  1+1 --> 2
c    (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0 ∧  p_741) -> (-b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0)
c  in CNF:
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_2
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨  b^{19, 40}_1
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ -p_741 ∨ -b^{19, 40}_0
c  in DIMACS:
 13484  13485 -13486 -741 -13487 0
 13484  13485 -13486 -741  13488 0
 13484  13485 -13486 -741 -13489 0

c  2+1 --> break 
c    (-b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧  p_741) -> break
c  in CNF:
c     b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 13484 -13485  13486 -741 1162 0


c  2-1 --> 1
c    (-b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧ -p_741) -> (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0)
c  in CNF:
c     b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_2
c     b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_1
c     b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨  b^{19, 40}_0
c  in DIMACS:
 13484 -13485  13486  741 -13487 0
 13484 -13485  13486  741 -13488 0
 13484 -13485  13486  741  13489 0

c  1-1 --> 0
c    (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0 ∧ -p_741) -> (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧ -b^{19, 40}_0)
c  in CNF:
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_2
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_1
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_0
c  in DIMACS:
 13484  13485 -13486  741 -13487 0
 13484  13485 -13486  741 -13488 0
 13484  13485 -13486  741 -13489 0

c  0-1 --> -1
c    (-b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧ -p_741) -> ( b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0)
c  in CNF:
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨  b^{19, 40}_2
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_1
c     b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨  b^{19, 40}_0
c  in DIMACS:
 13484  13485  13486  741  13487 0
 13484  13485  13486  741 -13488 0
 13484  13485  13486  741  13489 0

c  -1-1 --> -2
c    ( b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧  b^{19, 39}_0 ∧ -p_741) -> ( b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0)
c  in CNF:
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨  b^{19, 40}_2
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨  b^{19, 40}_1
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨  p_741 ∨ -b^{19, 40}_0
c  in DIMACS:
-13484  13485 -13486  741  13487 0
-13484  13485 -13486  741  13488 0
-13484  13485 -13486  741 -13489 0

c  -2-1 --> break 
c    ( b^{19, 39}_2 ∧  b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨  b^{19, 39}_0 ∨  p_741 ∨ break
c  in DIMACS:
-13484 -13485  13486  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 39}_2 ∧ -b^{19, 39}_1 ∧ -b^{19, 39}_0 ∧ true) 
c  in CNF:
c    -b^{19, 39}_2 ∨  b^{19, 39}_1 ∨  b^{19, 39}_0 ∨ false 
c  in DIMACS:
-13484  13485  13486  0

c  3 does not represent an automaton state.
c    -(-b^{19, 39}_2 ∧  b^{19, 39}_1 ∧  b^{19, 39}_0 ∧ true) 
c  in CNF:
c     b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ false 
c  in DIMACS:
 13484 -13485 -13486  0
c  -3 does not represent an automaton state.
c    -( b^{19, 39}_2 ∧  b^{19, 39}_1 ∧  b^{19, 39}_0 ∧ true) 
c  in CNF:
c    -b^{19, 39}_2 ∨ -b^{19, 39}_1 ∨ -b^{19, 39}_0 ∨ false 
c  in DIMACS:
-13484 -13485 -13486  0

c i = 40
c  -2+1 --> -1
c    ( b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧  p_760) -> ( b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0)
c  in CNF:
c    -b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨  b^{19, 41}_2
c    -b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_1
c    -b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨  b^{19, 41}_0
c  in DIMACS:
-13487 -13488  13489 -760  13490 0
-13487 -13488  13489 -760 -13491 0
-13487 -13488  13489 -760  13492 0

c  -1+1 --> 0
c    ( b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0 ∧  p_760) -> (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧ -b^{19, 41}_0)
c  in CNF:
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_2
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_1
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_0
c  in DIMACS:
-13487  13488 -13489 -760 -13490 0
-13487  13488 -13489 -760 -13491 0
-13487  13488 -13489 -760 -13492 0

c  0+1 --> 1
c    (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧  p_760) -> (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0)
c  in CNF:
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_2
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_1
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨  b^{19, 41}_0
c  in DIMACS:
 13487  13488  13489 -760 -13490 0
 13487  13488  13489 -760 -13491 0
 13487  13488  13489 -760  13492 0

c  1+1 --> 2
c    (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0 ∧  p_760) -> (-b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0)
c  in CNF:
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_2
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨  b^{19, 41}_1
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ -p_760 ∨ -b^{19, 41}_0
c  in DIMACS:
 13487  13488 -13489 -760 -13490 0
 13487  13488 -13489 -760  13491 0
 13487  13488 -13489 -760 -13492 0

c  2+1 --> break 
c    (-b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧  p_760) -> break
c  in CNF:
c     b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 13487 -13488  13489 -760 1162 0


c  2-1 --> 1
c    (-b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧ -p_760) -> (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0)
c  in CNF:
c     b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_2
c     b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_1
c     b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨  b^{19, 41}_0
c  in DIMACS:
 13487 -13488  13489  760 -13490 0
 13487 -13488  13489  760 -13491 0
 13487 -13488  13489  760  13492 0

c  1-1 --> 0
c    (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0 ∧ -p_760) -> (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧ -b^{19, 41}_0)
c  in CNF:
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_2
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_1
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_0
c  in DIMACS:
 13487  13488 -13489  760 -13490 0
 13487  13488 -13489  760 -13491 0
 13487  13488 -13489  760 -13492 0

c  0-1 --> -1
c    (-b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧ -p_760) -> ( b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0)
c  in CNF:
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨  b^{19, 41}_2
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_1
c     b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨  b^{19, 41}_0
c  in DIMACS:
 13487  13488  13489  760  13490 0
 13487  13488  13489  760 -13491 0
 13487  13488  13489  760  13492 0

c  -1-1 --> -2
c    ( b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧  b^{19, 40}_0 ∧ -p_760) -> ( b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0)
c  in CNF:
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨  b^{19, 41}_2
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨  b^{19, 41}_1
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨  p_760 ∨ -b^{19, 41}_0
c  in DIMACS:
-13487  13488 -13489  760  13490 0
-13487  13488 -13489  760  13491 0
-13487  13488 -13489  760 -13492 0

c  -2-1 --> break 
c    ( b^{19, 40}_2 ∧  b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨  b^{19, 40}_0 ∨  p_760 ∨ break
c  in DIMACS:
-13487 -13488  13489  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 40}_2 ∧ -b^{19, 40}_1 ∧ -b^{19, 40}_0 ∧ true) 
c  in CNF:
c    -b^{19, 40}_2 ∨  b^{19, 40}_1 ∨  b^{19, 40}_0 ∨ false 
c  in DIMACS:
-13487  13488  13489  0

c  3 does not represent an automaton state.
c    -(-b^{19, 40}_2 ∧  b^{19, 40}_1 ∧  b^{19, 40}_0 ∧ true) 
c  in CNF:
c     b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ false 
c  in DIMACS:
 13487 -13488 -13489  0
c  -3 does not represent an automaton state.
c    -( b^{19, 40}_2 ∧  b^{19, 40}_1 ∧  b^{19, 40}_0 ∧ true) 
c  in CNF:
c    -b^{19, 40}_2 ∨ -b^{19, 40}_1 ∨ -b^{19, 40}_0 ∨ false 
c  in DIMACS:
-13487 -13488 -13489  0

c i = 41
c  -2+1 --> -1
c    ( b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧  p_779) -> ( b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0)
c  in CNF:
c    -b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨  b^{19, 42}_2
c    -b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_1
c    -b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨  b^{19, 42}_0
c  in DIMACS:
-13490 -13491  13492 -779  13493 0
-13490 -13491  13492 -779 -13494 0
-13490 -13491  13492 -779  13495 0

c  -1+1 --> 0
c    ( b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0 ∧  p_779) -> (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧ -b^{19, 42}_0)
c  in CNF:
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_2
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_1
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_0
c  in DIMACS:
-13490  13491 -13492 -779 -13493 0
-13490  13491 -13492 -779 -13494 0
-13490  13491 -13492 -779 -13495 0

c  0+1 --> 1
c    (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧  p_779) -> (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0)
c  in CNF:
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_2
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_1
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨  b^{19, 42}_0
c  in DIMACS:
 13490  13491  13492 -779 -13493 0
 13490  13491  13492 -779 -13494 0
 13490  13491  13492 -779  13495 0

c  1+1 --> 2
c    (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0 ∧  p_779) -> (-b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0)
c  in CNF:
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_2
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨  b^{19, 42}_1
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ -p_779 ∨ -b^{19, 42}_0
c  in DIMACS:
 13490  13491 -13492 -779 -13493 0
 13490  13491 -13492 -779  13494 0
 13490  13491 -13492 -779 -13495 0

c  2+1 --> break 
c    (-b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧  p_779) -> break
c  in CNF:
c     b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ -p_779 ∨ break
c  in DIMACS:
 13490 -13491  13492 -779 1162 0


c  2-1 --> 1
c    (-b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧ -p_779) -> (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0)
c  in CNF:
c     b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_2
c     b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_1
c     b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨  b^{19, 42}_0
c  in DIMACS:
 13490 -13491  13492  779 -13493 0
 13490 -13491  13492  779 -13494 0
 13490 -13491  13492  779  13495 0

c  1-1 --> 0
c    (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0 ∧ -p_779) -> (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧ -b^{19, 42}_0)
c  in CNF:
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_2
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_1
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_0
c  in DIMACS:
 13490  13491 -13492  779 -13493 0
 13490  13491 -13492  779 -13494 0
 13490  13491 -13492  779 -13495 0

c  0-1 --> -1
c    (-b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧ -p_779) -> ( b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0)
c  in CNF:
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨  b^{19, 42}_2
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_1
c     b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨  b^{19, 42}_0
c  in DIMACS:
 13490  13491  13492  779  13493 0
 13490  13491  13492  779 -13494 0
 13490  13491  13492  779  13495 0

c  -1-1 --> -2
c    ( b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧  b^{19, 41}_0 ∧ -p_779) -> ( b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0)
c  in CNF:
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨  b^{19, 42}_2
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨  b^{19, 42}_1
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨  p_779 ∨ -b^{19, 42}_0
c  in DIMACS:
-13490  13491 -13492  779  13493 0
-13490  13491 -13492  779  13494 0
-13490  13491 -13492  779 -13495 0

c  -2-1 --> break 
c    ( b^{19, 41}_2 ∧  b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧ -p_779) -> break
c  in CNF:
c    -b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨  b^{19, 41}_0 ∨  p_779 ∨ break
c  in DIMACS:
-13490 -13491  13492  779 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 41}_2 ∧ -b^{19, 41}_1 ∧ -b^{19, 41}_0 ∧ true) 
c  in CNF:
c    -b^{19, 41}_2 ∨  b^{19, 41}_1 ∨  b^{19, 41}_0 ∨ false 
c  in DIMACS:
-13490  13491  13492  0

c  3 does not represent an automaton state.
c    -(-b^{19, 41}_2 ∧  b^{19, 41}_1 ∧  b^{19, 41}_0 ∧ true) 
c  in CNF:
c     b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ false 
c  in DIMACS:
 13490 -13491 -13492  0
c  -3 does not represent an automaton state.
c    -( b^{19, 41}_2 ∧  b^{19, 41}_1 ∧  b^{19, 41}_0 ∧ true) 
c  in CNF:
c    -b^{19, 41}_2 ∨ -b^{19, 41}_1 ∨ -b^{19, 41}_0 ∨ false 
c  in DIMACS:
-13490 -13491 -13492  0

c i = 42
c  -2+1 --> -1
c    ( b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧  p_798) -> ( b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0)
c  in CNF:
c    -b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨  b^{19, 43}_2
c    -b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_1
c    -b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨  b^{19, 43}_0
c  in DIMACS:
-13493 -13494  13495 -798  13496 0
-13493 -13494  13495 -798 -13497 0
-13493 -13494  13495 -798  13498 0

c  -1+1 --> 0
c    ( b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0 ∧  p_798) -> (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧ -b^{19, 43}_0)
c  in CNF:
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_2
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_1
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_0
c  in DIMACS:
-13493  13494 -13495 -798 -13496 0
-13493  13494 -13495 -798 -13497 0
-13493  13494 -13495 -798 -13498 0

c  0+1 --> 1
c    (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧  p_798) -> (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0)
c  in CNF:
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_2
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_1
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨  b^{19, 43}_0
c  in DIMACS:
 13493  13494  13495 -798 -13496 0
 13493  13494  13495 -798 -13497 0
 13493  13494  13495 -798  13498 0

c  1+1 --> 2
c    (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0 ∧  p_798) -> (-b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0)
c  in CNF:
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_2
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨  b^{19, 43}_1
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ -p_798 ∨ -b^{19, 43}_0
c  in DIMACS:
 13493  13494 -13495 -798 -13496 0
 13493  13494 -13495 -798  13497 0
 13493  13494 -13495 -798 -13498 0

c  2+1 --> break 
c    (-b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧  p_798) -> break
c  in CNF:
c     b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 13493 -13494  13495 -798 1162 0


c  2-1 --> 1
c    (-b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧ -p_798) -> (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0)
c  in CNF:
c     b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_2
c     b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_1
c     b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨  b^{19, 43}_0
c  in DIMACS:
 13493 -13494  13495  798 -13496 0
 13493 -13494  13495  798 -13497 0
 13493 -13494  13495  798  13498 0

c  1-1 --> 0
c    (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0 ∧ -p_798) -> (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧ -b^{19, 43}_0)
c  in CNF:
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_2
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_1
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_0
c  in DIMACS:
 13493  13494 -13495  798 -13496 0
 13493  13494 -13495  798 -13497 0
 13493  13494 -13495  798 -13498 0

c  0-1 --> -1
c    (-b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧ -p_798) -> ( b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0)
c  in CNF:
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨  b^{19, 43}_2
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_1
c     b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨  b^{19, 43}_0
c  in DIMACS:
 13493  13494  13495  798  13496 0
 13493  13494  13495  798 -13497 0
 13493  13494  13495  798  13498 0

c  -1-1 --> -2
c    ( b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧  b^{19, 42}_0 ∧ -p_798) -> ( b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0)
c  in CNF:
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨  b^{19, 43}_2
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨  b^{19, 43}_1
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨  p_798 ∨ -b^{19, 43}_0
c  in DIMACS:
-13493  13494 -13495  798  13496 0
-13493  13494 -13495  798  13497 0
-13493  13494 -13495  798 -13498 0

c  -2-1 --> break 
c    ( b^{19, 42}_2 ∧  b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨  b^{19, 42}_0 ∨  p_798 ∨ break
c  in DIMACS:
-13493 -13494  13495  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 42}_2 ∧ -b^{19, 42}_1 ∧ -b^{19, 42}_0 ∧ true) 
c  in CNF:
c    -b^{19, 42}_2 ∨  b^{19, 42}_1 ∨  b^{19, 42}_0 ∨ false 
c  in DIMACS:
-13493  13494  13495  0

c  3 does not represent an automaton state.
c    -(-b^{19, 42}_2 ∧  b^{19, 42}_1 ∧  b^{19, 42}_0 ∧ true) 
c  in CNF:
c     b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ false 
c  in DIMACS:
 13493 -13494 -13495  0
c  -3 does not represent an automaton state.
c    -( b^{19, 42}_2 ∧  b^{19, 42}_1 ∧  b^{19, 42}_0 ∧ true) 
c  in CNF:
c    -b^{19, 42}_2 ∨ -b^{19, 42}_1 ∨ -b^{19, 42}_0 ∨ false 
c  in DIMACS:
-13493 -13494 -13495  0

c i = 43
c  -2+1 --> -1
c    ( b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧  p_817) -> ( b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0)
c  in CNF:
c    -b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨  b^{19, 44}_2
c    -b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_1
c    -b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨  b^{19, 44}_0
c  in DIMACS:
-13496 -13497  13498 -817  13499 0
-13496 -13497  13498 -817 -13500 0
-13496 -13497  13498 -817  13501 0

c  -1+1 --> 0
c    ( b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0 ∧  p_817) -> (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧ -b^{19, 44}_0)
c  in CNF:
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_2
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_1
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_0
c  in DIMACS:
-13496  13497 -13498 -817 -13499 0
-13496  13497 -13498 -817 -13500 0
-13496  13497 -13498 -817 -13501 0

c  0+1 --> 1
c    (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧  p_817) -> (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0)
c  in CNF:
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_2
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_1
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨  b^{19, 44}_0
c  in DIMACS:
 13496  13497  13498 -817 -13499 0
 13496  13497  13498 -817 -13500 0
 13496  13497  13498 -817  13501 0

c  1+1 --> 2
c    (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0 ∧  p_817) -> (-b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0)
c  in CNF:
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_2
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨  b^{19, 44}_1
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ -p_817 ∨ -b^{19, 44}_0
c  in DIMACS:
 13496  13497 -13498 -817 -13499 0
 13496  13497 -13498 -817  13500 0
 13496  13497 -13498 -817 -13501 0

c  2+1 --> break 
c    (-b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧  p_817) -> break
c  in CNF:
c     b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ -p_817 ∨ break
c  in DIMACS:
 13496 -13497  13498 -817 1162 0


c  2-1 --> 1
c    (-b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧ -p_817) -> (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0)
c  in CNF:
c     b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_2
c     b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_1
c     b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨  b^{19, 44}_0
c  in DIMACS:
 13496 -13497  13498  817 -13499 0
 13496 -13497  13498  817 -13500 0
 13496 -13497  13498  817  13501 0

c  1-1 --> 0
c    (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0 ∧ -p_817) -> (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧ -b^{19, 44}_0)
c  in CNF:
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_2
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_1
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_0
c  in DIMACS:
 13496  13497 -13498  817 -13499 0
 13496  13497 -13498  817 -13500 0
 13496  13497 -13498  817 -13501 0

c  0-1 --> -1
c    (-b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧ -p_817) -> ( b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0)
c  in CNF:
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨  b^{19, 44}_2
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_1
c     b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨  b^{19, 44}_0
c  in DIMACS:
 13496  13497  13498  817  13499 0
 13496  13497  13498  817 -13500 0
 13496  13497  13498  817  13501 0

c  -1-1 --> -2
c    ( b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧  b^{19, 43}_0 ∧ -p_817) -> ( b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0)
c  in CNF:
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨  b^{19, 44}_2
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨  b^{19, 44}_1
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨  p_817 ∨ -b^{19, 44}_0
c  in DIMACS:
-13496  13497 -13498  817  13499 0
-13496  13497 -13498  817  13500 0
-13496  13497 -13498  817 -13501 0

c  -2-1 --> break 
c    ( b^{19, 43}_2 ∧  b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧ -p_817) -> break
c  in CNF:
c    -b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨  b^{19, 43}_0 ∨  p_817 ∨ break
c  in DIMACS:
-13496 -13497  13498  817 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 43}_2 ∧ -b^{19, 43}_1 ∧ -b^{19, 43}_0 ∧ true) 
c  in CNF:
c    -b^{19, 43}_2 ∨  b^{19, 43}_1 ∨  b^{19, 43}_0 ∨ false 
c  in DIMACS:
-13496  13497  13498  0

c  3 does not represent an automaton state.
c    -(-b^{19, 43}_2 ∧  b^{19, 43}_1 ∧  b^{19, 43}_0 ∧ true) 
c  in CNF:
c     b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ false 
c  in DIMACS:
 13496 -13497 -13498  0
c  -3 does not represent an automaton state.
c    -( b^{19, 43}_2 ∧  b^{19, 43}_1 ∧  b^{19, 43}_0 ∧ true) 
c  in CNF:
c    -b^{19, 43}_2 ∨ -b^{19, 43}_1 ∨ -b^{19, 43}_0 ∨ false 
c  in DIMACS:
-13496 -13497 -13498  0

c i = 44
c  -2+1 --> -1
c    ( b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧  p_836) -> ( b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0)
c  in CNF:
c    -b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨  b^{19, 45}_2
c    -b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_1
c    -b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨  b^{19, 45}_0
c  in DIMACS:
-13499 -13500  13501 -836  13502 0
-13499 -13500  13501 -836 -13503 0
-13499 -13500  13501 -836  13504 0

c  -1+1 --> 0
c    ( b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0 ∧  p_836) -> (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧ -b^{19, 45}_0)
c  in CNF:
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_2
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_1
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_0
c  in DIMACS:
-13499  13500 -13501 -836 -13502 0
-13499  13500 -13501 -836 -13503 0
-13499  13500 -13501 -836 -13504 0

c  0+1 --> 1
c    (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧  p_836) -> (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0)
c  in CNF:
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_2
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_1
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨  b^{19, 45}_0
c  in DIMACS:
 13499  13500  13501 -836 -13502 0
 13499  13500  13501 -836 -13503 0
 13499  13500  13501 -836  13504 0

c  1+1 --> 2
c    (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0 ∧  p_836) -> (-b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0)
c  in CNF:
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_2
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨  b^{19, 45}_1
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ -p_836 ∨ -b^{19, 45}_0
c  in DIMACS:
 13499  13500 -13501 -836 -13502 0
 13499  13500 -13501 -836  13503 0
 13499  13500 -13501 -836 -13504 0

c  2+1 --> break 
c    (-b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧  p_836) -> break
c  in CNF:
c     b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 13499 -13500  13501 -836 1162 0


c  2-1 --> 1
c    (-b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧ -p_836) -> (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0)
c  in CNF:
c     b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_2
c     b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_1
c     b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨  b^{19, 45}_0
c  in DIMACS:
 13499 -13500  13501  836 -13502 0
 13499 -13500  13501  836 -13503 0
 13499 -13500  13501  836  13504 0

c  1-1 --> 0
c    (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0 ∧ -p_836) -> (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧ -b^{19, 45}_0)
c  in CNF:
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_2
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_1
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_0
c  in DIMACS:
 13499  13500 -13501  836 -13502 0
 13499  13500 -13501  836 -13503 0
 13499  13500 -13501  836 -13504 0

c  0-1 --> -1
c    (-b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧ -p_836) -> ( b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0)
c  in CNF:
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨  b^{19, 45}_2
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_1
c     b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨  b^{19, 45}_0
c  in DIMACS:
 13499  13500  13501  836  13502 0
 13499  13500  13501  836 -13503 0
 13499  13500  13501  836  13504 0

c  -1-1 --> -2
c    ( b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧  b^{19, 44}_0 ∧ -p_836) -> ( b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0)
c  in CNF:
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨  b^{19, 45}_2
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨  b^{19, 45}_1
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨  p_836 ∨ -b^{19, 45}_0
c  in DIMACS:
-13499  13500 -13501  836  13502 0
-13499  13500 -13501  836  13503 0
-13499  13500 -13501  836 -13504 0

c  -2-1 --> break 
c    ( b^{19, 44}_2 ∧  b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨  b^{19, 44}_0 ∨  p_836 ∨ break
c  in DIMACS:
-13499 -13500  13501  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 44}_2 ∧ -b^{19, 44}_1 ∧ -b^{19, 44}_0 ∧ true) 
c  in CNF:
c    -b^{19, 44}_2 ∨  b^{19, 44}_1 ∨  b^{19, 44}_0 ∨ false 
c  in DIMACS:
-13499  13500  13501  0

c  3 does not represent an automaton state.
c    -(-b^{19, 44}_2 ∧  b^{19, 44}_1 ∧  b^{19, 44}_0 ∧ true) 
c  in CNF:
c     b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ false 
c  in DIMACS:
 13499 -13500 -13501  0
c  -3 does not represent an automaton state.
c    -( b^{19, 44}_2 ∧  b^{19, 44}_1 ∧  b^{19, 44}_0 ∧ true) 
c  in CNF:
c    -b^{19, 44}_2 ∨ -b^{19, 44}_1 ∨ -b^{19, 44}_0 ∨ false 
c  in DIMACS:
-13499 -13500 -13501  0

c i = 45
c  -2+1 --> -1
c    ( b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧  p_855) -> ( b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0)
c  in CNF:
c    -b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨  b^{19, 46}_2
c    -b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_1
c    -b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨  b^{19, 46}_0
c  in DIMACS:
-13502 -13503  13504 -855  13505 0
-13502 -13503  13504 -855 -13506 0
-13502 -13503  13504 -855  13507 0

c  -1+1 --> 0
c    ( b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0 ∧  p_855) -> (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧ -b^{19, 46}_0)
c  in CNF:
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_2
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_1
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_0
c  in DIMACS:
-13502  13503 -13504 -855 -13505 0
-13502  13503 -13504 -855 -13506 0
-13502  13503 -13504 -855 -13507 0

c  0+1 --> 1
c    (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧  p_855) -> (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0)
c  in CNF:
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_2
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_1
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨  b^{19, 46}_0
c  in DIMACS:
 13502  13503  13504 -855 -13505 0
 13502  13503  13504 -855 -13506 0
 13502  13503  13504 -855  13507 0

c  1+1 --> 2
c    (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0 ∧  p_855) -> (-b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0)
c  in CNF:
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_2
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨  b^{19, 46}_1
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ -p_855 ∨ -b^{19, 46}_0
c  in DIMACS:
 13502  13503 -13504 -855 -13505 0
 13502  13503 -13504 -855  13506 0
 13502  13503 -13504 -855 -13507 0

c  2+1 --> break 
c    (-b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧  p_855) -> break
c  in CNF:
c     b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 13502 -13503  13504 -855 1162 0


c  2-1 --> 1
c    (-b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧ -p_855) -> (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0)
c  in CNF:
c     b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_2
c     b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_1
c     b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨  b^{19, 46}_0
c  in DIMACS:
 13502 -13503  13504  855 -13505 0
 13502 -13503  13504  855 -13506 0
 13502 -13503  13504  855  13507 0

c  1-1 --> 0
c    (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0 ∧ -p_855) -> (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧ -b^{19, 46}_0)
c  in CNF:
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_2
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_1
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_0
c  in DIMACS:
 13502  13503 -13504  855 -13505 0
 13502  13503 -13504  855 -13506 0
 13502  13503 -13504  855 -13507 0

c  0-1 --> -1
c    (-b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧ -p_855) -> ( b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0)
c  in CNF:
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨  b^{19, 46}_2
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_1
c     b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨  b^{19, 46}_0
c  in DIMACS:
 13502  13503  13504  855  13505 0
 13502  13503  13504  855 -13506 0
 13502  13503  13504  855  13507 0

c  -1-1 --> -2
c    ( b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧  b^{19, 45}_0 ∧ -p_855) -> ( b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0)
c  in CNF:
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨  b^{19, 46}_2
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨  b^{19, 46}_1
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨  p_855 ∨ -b^{19, 46}_0
c  in DIMACS:
-13502  13503 -13504  855  13505 0
-13502  13503 -13504  855  13506 0
-13502  13503 -13504  855 -13507 0

c  -2-1 --> break 
c    ( b^{19, 45}_2 ∧  b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨  b^{19, 45}_0 ∨  p_855 ∨ break
c  in DIMACS:
-13502 -13503  13504  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 45}_2 ∧ -b^{19, 45}_1 ∧ -b^{19, 45}_0 ∧ true) 
c  in CNF:
c    -b^{19, 45}_2 ∨  b^{19, 45}_1 ∨  b^{19, 45}_0 ∨ false 
c  in DIMACS:
-13502  13503  13504  0

c  3 does not represent an automaton state.
c    -(-b^{19, 45}_2 ∧  b^{19, 45}_1 ∧  b^{19, 45}_0 ∧ true) 
c  in CNF:
c     b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ false 
c  in DIMACS:
 13502 -13503 -13504  0
c  -3 does not represent an automaton state.
c    -( b^{19, 45}_2 ∧  b^{19, 45}_1 ∧  b^{19, 45}_0 ∧ true) 
c  in CNF:
c    -b^{19, 45}_2 ∨ -b^{19, 45}_1 ∨ -b^{19, 45}_0 ∨ false 
c  in DIMACS:
-13502 -13503 -13504  0

c i = 46
c  -2+1 --> -1
c    ( b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧  p_874) -> ( b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0)
c  in CNF:
c    -b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨  b^{19, 47}_2
c    -b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_1
c    -b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨  b^{19, 47}_0
c  in DIMACS:
-13505 -13506  13507 -874  13508 0
-13505 -13506  13507 -874 -13509 0
-13505 -13506  13507 -874  13510 0

c  -1+1 --> 0
c    ( b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0 ∧  p_874) -> (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧ -b^{19, 47}_0)
c  in CNF:
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_2
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_1
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_0
c  in DIMACS:
-13505  13506 -13507 -874 -13508 0
-13505  13506 -13507 -874 -13509 0
-13505  13506 -13507 -874 -13510 0

c  0+1 --> 1
c    (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧  p_874) -> (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0)
c  in CNF:
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_2
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_1
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨  b^{19, 47}_0
c  in DIMACS:
 13505  13506  13507 -874 -13508 0
 13505  13506  13507 -874 -13509 0
 13505  13506  13507 -874  13510 0

c  1+1 --> 2
c    (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0 ∧  p_874) -> (-b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0)
c  in CNF:
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_2
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨  b^{19, 47}_1
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ -p_874 ∨ -b^{19, 47}_0
c  in DIMACS:
 13505  13506 -13507 -874 -13508 0
 13505  13506 -13507 -874  13509 0
 13505  13506 -13507 -874 -13510 0

c  2+1 --> break 
c    (-b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧  p_874) -> break
c  in CNF:
c     b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 13505 -13506  13507 -874 1162 0


c  2-1 --> 1
c    (-b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧ -p_874) -> (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0)
c  in CNF:
c     b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_2
c     b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_1
c     b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨  b^{19, 47}_0
c  in DIMACS:
 13505 -13506  13507  874 -13508 0
 13505 -13506  13507  874 -13509 0
 13505 -13506  13507  874  13510 0

c  1-1 --> 0
c    (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0 ∧ -p_874) -> (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧ -b^{19, 47}_0)
c  in CNF:
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_2
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_1
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_0
c  in DIMACS:
 13505  13506 -13507  874 -13508 0
 13505  13506 -13507  874 -13509 0
 13505  13506 -13507  874 -13510 0

c  0-1 --> -1
c    (-b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧ -p_874) -> ( b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0)
c  in CNF:
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨  b^{19, 47}_2
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_1
c     b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨  b^{19, 47}_0
c  in DIMACS:
 13505  13506  13507  874  13508 0
 13505  13506  13507  874 -13509 0
 13505  13506  13507  874  13510 0

c  -1-1 --> -2
c    ( b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧  b^{19, 46}_0 ∧ -p_874) -> ( b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0)
c  in CNF:
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨  b^{19, 47}_2
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨  b^{19, 47}_1
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨  p_874 ∨ -b^{19, 47}_0
c  in DIMACS:
-13505  13506 -13507  874  13508 0
-13505  13506 -13507  874  13509 0
-13505  13506 -13507  874 -13510 0

c  -2-1 --> break 
c    ( b^{19, 46}_2 ∧  b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨  b^{19, 46}_0 ∨  p_874 ∨ break
c  in DIMACS:
-13505 -13506  13507  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 46}_2 ∧ -b^{19, 46}_1 ∧ -b^{19, 46}_0 ∧ true) 
c  in CNF:
c    -b^{19, 46}_2 ∨  b^{19, 46}_1 ∨  b^{19, 46}_0 ∨ false 
c  in DIMACS:
-13505  13506  13507  0

c  3 does not represent an automaton state.
c    -(-b^{19, 46}_2 ∧  b^{19, 46}_1 ∧  b^{19, 46}_0 ∧ true) 
c  in CNF:
c     b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ false 
c  in DIMACS:
 13505 -13506 -13507  0
c  -3 does not represent an automaton state.
c    -( b^{19, 46}_2 ∧  b^{19, 46}_1 ∧  b^{19, 46}_0 ∧ true) 
c  in CNF:
c    -b^{19, 46}_2 ∨ -b^{19, 46}_1 ∨ -b^{19, 46}_0 ∨ false 
c  in DIMACS:
-13505 -13506 -13507  0

c i = 47
c  -2+1 --> -1
c    ( b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧  p_893) -> ( b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0)
c  in CNF:
c    -b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨  b^{19, 48}_2
c    -b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_1
c    -b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨  b^{19, 48}_0
c  in DIMACS:
-13508 -13509  13510 -893  13511 0
-13508 -13509  13510 -893 -13512 0
-13508 -13509  13510 -893  13513 0

c  -1+1 --> 0
c    ( b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0 ∧  p_893) -> (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧ -b^{19, 48}_0)
c  in CNF:
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_2
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_1
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_0
c  in DIMACS:
-13508  13509 -13510 -893 -13511 0
-13508  13509 -13510 -893 -13512 0
-13508  13509 -13510 -893 -13513 0

c  0+1 --> 1
c    (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧  p_893) -> (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0)
c  in CNF:
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_2
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_1
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨  b^{19, 48}_0
c  in DIMACS:
 13508  13509  13510 -893 -13511 0
 13508  13509  13510 -893 -13512 0
 13508  13509  13510 -893  13513 0

c  1+1 --> 2
c    (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0 ∧  p_893) -> (-b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0)
c  in CNF:
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_2
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨  b^{19, 48}_1
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ -p_893 ∨ -b^{19, 48}_0
c  in DIMACS:
 13508  13509 -13510 -893 -13511 0
 13508  13509 -13510 -893  13512 0
 13508  13509 -13510 -893 -13513 0

c  2+1 --> break 
c    (-b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧  p_893) -> break
c  in CNF:
c     b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ -p_893 ∨ break
c  in DIMACS:
 13508 -13509  13510 -893 1162 0


c  2-1 --> 1
c    (-b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧ -p_893) -> (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0)
c  in CNF:
c     b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_2
c     b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_1
c     b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨  b^{19, 48}_0
c  in DIMACS:
 13508 -13509  13510  893 -13511 0
 13508 -13509  13510  893 -13512 0
 13508 -13509  13510  893  13513 0

c  1-1 --> 0
c    (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0 ∧ -p_893) -> (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧ -b^{19, 48}_0)
c  in CNF:
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_2
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_1
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_0
c  in DIMACS:
 13508  13509 -13510  893 -13511 0
 13508  13509 -13510  893 -13512 0
 13508  13509 -13510  893 -13513 0

c  0-1 --> -1
c    (-b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧ -p_893) -> ( b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0)
c  in CNF:
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨  b^{19, 48}_2
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_1
c     b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨  b^{19, 48}_0
c  in DIMACS:
 13508  13509  13510  893  13511 0
 13508  13509  13510  893 -13512 0
 13508  13509  13510  893  13513 0

c  -1-1 --> -2
c    ( b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧  b^{19, 47}_0 ∧ -p_893) -> ( b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0)
c  in CNF:
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨  b^{19, 48}_2
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨  b^{19, 48}_1
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨  p_893 ∨ -b^{19, 48}_0
c  in DIMACS:
-13508  13509 -13510  893  13511 0
-13508  13509 -13510  893  13512 0
-13508  13509 -13510  893 -13513 0

c  -2-1 --> break 
c    ( b^{19, 47}_2 ∧  b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧ -p_893) -> break
c  in CNF:
c    -b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨  b^{19, 47}_0 ∨  p_893 ∨ break
c  in DIMACS:
-13508 -13509  13510  893 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 47}_2 ∧ -b^{19, 47}_1 ∧ -b^{19, 47}_0 ∧ true) 
c  in CNF:
c    -b^{19, 47}_2 ∨  b^{19, 47}_1 ∨  b^{19, 47}_0 ∨ false 
c  in DIMACS:
-13508  13509  13510  0

c  3 does not represent an automaton state.
c    -(-b^{19, 47}_2 ∧  b^{19, 47}_1 ∧  b^{19, 47}_0 ∧ true) 
c  in CNF:
c     b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ false 
c  in DIMACS:
 13508 -13509 -13510  0
c  -3 does not represent an automaton state.
c    -( b^{19, 47}_2 ∧  b^{19, 47}_1 ∧  b^{19, 47}_0 ∧ true) 
c  in CNF:
c    -b^{19, 47}_2 ∨ -b^{19, 47}_1 ∨ -b^{19, 47}_0 ∨ false 
c  in DIMACS:
-13508 -13509 -13510  0

c i = 48
c  -2+1 --> -1
c    ( b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧  p_912) -> ( b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0)
c  in CNF:
c    -b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨  b^{19, 49}_2
c    -b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_1
c    -b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨  b^{19, 49}_0
c  in DIMACS:
-13511 -13512  13513 -912  13514 0
-13511 -13512  13513 -912 -13515 0
-13511 -13512  13513 -912  13516 0

c  -1+1 --> 0
c    ( b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0 ∧  p_912) -> (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧ -b^{19, 49}_0)
c  in CNF:
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_2
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_1
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_0
c  in DIMACS:
-13511  13512 -13513 -912 -13514 0
-13511  13512 -13513 -912 -13515 0
-13511  13512 -13513 -912 -13516 0

c  0+1 --> 1
c    (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧  p_912) -> (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0)
c  in CNF:
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_2
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_1
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨  b^{19, 49}_0
c  in DIMACS:
 13511  13512  13513 -912 -13514 0
 13511  13512  13513 -912 -13515 0
 13511  13512  13513 -912  13516 0

c  1+1 --> 2
c    (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0 ∧  p_912) -> (-b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0)
c  in CNF:
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_2
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨  b^{19, 49}_1
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ -p_912 ∨ -b^{19, 49}_0
c  in DIMACS:
 13511  13512 -13513 -912 -13514 0
 13511  13512 -13513 -912  13515 0
 13511  13512 -13513 -912 -13516 0

c  2+1 --> break 
c    (-b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧  p_912) -> break
c  in CNF:
c     b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 13511 -13512  13513 -912 1162 0


c  2-1 --> 1
c    (-b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧ -p_912) -> (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0)
c  in CNF:
c     b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_2
c     b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_1
c     b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨  b^{19, 49}_0
c  in DIMACS:
 13511 -13512  13513  912 -13514 0
 13511 -13512  13513  912 -13515 0
 13511 -13512  13513  912  13516 0

c  1-1 --> 0
c    (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0 ∧ -p_912) -> (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧ -b^{19, 49}_0)
c  in CNF:
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_2
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_1
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_0
c  in DIMACS:
 13511  13512 -13513  912 -13514 0
 13511  13512 -13513  912 -13515 0
 13511  13512 -13513  912 -13516 0

c  0-1 --> -1
c    (-b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧ -p_912) -> ( b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0)
c  in CNF:
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨  b^{19, 49}_2
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_1
c     b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨  b^{19, 49}_0
c  in DIMACS:
 13511  13512  13513  912  13514 0
 13511  13512  13513  912 -13515 0
 13511  13512  13513  912  13516 0

c  -1-1 --> -2
c    ( b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧  b^{19, 48}_0 ∧ -p_912) -> ( b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0)
c  in CNF:
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨  b^{19, 49}_2
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨  b^{19, 49}_1
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨  p_912 ∨ -b^{19, 49}_0
c  in DIMACS:
-13511  13512 -13513  912  13514 0
-13511  13512 -13513  912  13515 0
-13511  13512 -13513  912 -13516 0

c  -2-1 --> break 
c    ( b^{19, 48}_2 ∧  b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨  b^{19, 48}_0 ∨  p_912 ∨ break
c  in DIMACS:
-13511 -13512  13513  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 48}_2 ∧ -b^{19, 48}_1 ∧ -b^{19, 48}_0 ∧ true) 
c  in CNF:
c    -b^{19, 48}_2 ∨  b^{19, 48}_1 ∨  b^{19, 48}_0 ∨ false 
c  in DIMACS:
-13511  13512  13513  0

c  3 does not represent an automaton state.
c    -(-b^{19, 48}_2 ∧  b^{19, 48}_1 ∧  b^{19, 48}_0 ∧ true) 
c  in CNF:
c     b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ false 
c  in DIMACS:
 13511 -13512 -13513  0
c  -3 does not represent an automaton state.
c    -( b^{19, 48}_2 ∧  b^{19, 48}_1 ∧  b^{19, 48}_0 ∧ true) 
c  in CNF:
c    -b^{19, 48}_2 ∨ -b^{19, 48}_1 ∨ -b^{19, 48}_0 ∨ false 
c  in DIMACS:
-13511 -13512 -13513  0

c i = 49
c  -2+1 --> -1
c    ( b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧  p_931) -> ( b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0)
c  in CNF:
c    -b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨  b^{19, 50}_2
c    -b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_1
c    -b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨  b^{19, 50}_0
c  in DIMACS:
-13514 -13515  13516 -931  13517 0
-13514 -13515  13516 -931 -13518 0
-13514 -13515  13516 -931  13519 0

c  -1+1 --> 0
c    ( b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0 ∧  p_931) -> (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧ -b^{19, 50}_0)
c  in CNF:
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_2
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_1
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_0
c  in DIMACS:
-13514  13515 -13516 -931 -13517 0
-13514  13515 -13516 -931 -13518 0
-13514  13515 -13516 -931 -13519 0

c  0+1 --> 1
c    (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧  p_931) -> (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0)
c  in CNF:
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_2
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_1
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨  b^{19, 50}_0
c  in DIMACS:
 13514  13515  13516 -931 -13517 0
 13514  13515  13516 -931 -13518 0
 13514  13515  13516 -931  13519 0

c  1+1 --> 2
c    (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0 ∧  p_931) -> (-b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0)
c  in CNF:
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_2
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨  b^{19, 50}_1
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ -p_931 ∨ -b^{19, 50}_0
c  in DIMACS:
 13514  13515 -13516 -931 -13517 0
 13514  13515 -13516 -931  13518 0
 13514  13515 -13516 -931 -13519 0

c  2+1 --> break 
c    (-b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧  p_931) -> break
c  in CNF:
c     b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ -p_931 ∨ break
c  in DIMACS:
 13514 -13515  13516 -931 1162 0


c  2-1 --> 1
c    (-b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧ -p_931) -> (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0)
c  in CNF:
c     b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_2
c     b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_1
c     b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨  b^{19, 50}_0
c  in DIMACS:
 13514 -13515  13516  931 -13517 0
 13514 -13515  13516  931 -13518 0
 13514 -13515  13516  931  13519 0

c  1-1 --> 0
c    (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0 ∧ -p_931) -> (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧ -b^{19, 50}_0)
c  in CNF:
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_2
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_1
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_0
c  in DIMACS:
 13514  13515 -13516  931 -13517 0
 13514  13515 -13516  931 -13518 0
 13514  13515 -13516  931 -13519 0

c  0-1 --> -1
c    (-b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧ -p_931) -> ( b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0)
c  in CNF:
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨  b^{19, 50}_2
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_1
c     b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨  b^{19, 50}_0
c  in DIMACS:
 13514  13515  13516  931  13517 0
 13514  13515  13516  931 -13518 0
 13514  13515  13516  931  13519 0

c  -1-1 --> -2
c    ( b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧  b^{19, 49}_0 ∧ -p_931) -> ( b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0)
c  in CNF:
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨  b^{19, 50}_2
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨  b^{19, 50}_1
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨  p_931 ∨ -b^{19, 50}_0
c  in DIMACS:
-13514  13515 -13516  931  13517 0
-13514  13515 -13516  931  13518 0
-13514  13515 -13516  931 -13519 0

c  -2-1 --> break 
c    ( b^{19, 49}_2 ∧  b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧ -p_931) -> break
c  in CNF:
c    -b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨  b^{19, 49}_0 ∨  p_931 ∨ break
c  in DIMACS:
-13514 -13515  13516  931 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 49}_2 ∧ -b^{19, 49}_1 ∧ -b^{19, 49}_0 ∧ true) 
c  in CNF:
c    -b^{19, 49}_2 ∨  b^{19, 49}_1 ∨  b^{19, 49}_0 ∨ false 
c  in DIMACS:
-13514  13515  13516  0

c  3 does not represent an automaton state.
c    -(-b^{19, 49}_2 ∧  b^{19, 49}_1 ∧  b^{19, 49}_0 ∧ true) 
c  in CNF:
c     b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ false 
c  in DIMACS:
 13514 -13515 -13516  0
c  -3 does not represent an automaton state.
c    -( b^{19, 49}_2 ∧  b^{19, 49}_1 ∧  b^{19, 49}_0 ∧ true) 
c  in CNF:
c    -b^{19, 49}_2 ∨ -b^{19, 49}_1 ∨ -b^{19, 49}_0 ∨ false 
c  in DIMACS:
-13514 -13515 -13516  0

c i = 50
c  -2+1 --> -1
c    ( b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧  p_950) -> ( b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0)
c  in CNF:
c    -b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨  b^{19, 51}_2
c    -b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_1
c    -b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨  b^{19, 51}_0
c  in DIMACS:
-13517 -13518  13519 -950  13520 0
-13517 -13518  13519 -950 -13521 0
-13517 -13518  13519 -950  13522 0

c  -1+1 --> 0
c    ( b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0 ∧  p_950) -> (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧ -b^{19, 51}_0)
c  in CNF:
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_2
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_1
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_0
c  in DIMACS:
-13517  13518 -13519 -950 -13520 0
-13517  13518 -13519 -950 -13521 0
-13517  13518 -13519 -950 -13522 0

c  0+1 --> 1
c    (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧  p_950) -> (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0)
c  in CNF:
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_2
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_1
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨  b^{19, 51}_0
c  in DIMACS:
 13517  13518  13519 -950 -13520 0
 13517  13518  13519 -950 -13521 0
 13517  13518  13519 -950  13522 0

c  1+1 --> 2
c    (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0 ∧  p_950) -> (-b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0)
c  in CNF:
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_2
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨  b^{19, 51}_1
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ -p_950 ∨ -b^{19, 51}_0
c  in DIMACS:
 13517  13518 -13519 -950 -13520 0
 13517  13518 -13519 -950  13521 0
 13517  13518 -13519 -950 -13522 0

c  2+1 --> break 
c    (-b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧  p_950) -> break
c  in CNF:
c     b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 13517 -13518  13519 -950 1162 0


c  2-1 --> 1
c    (-b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧ -p_950) -> (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0)
c  in CNF:
c     b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_2
c     b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_1
c     b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨  b^{19, 51}_0
c  in DIMACS:
 13517 -13518  13519  950 -13520 0
 13517 -13518  13519  950 -13521 0
 13517 -13518  13519  950  13522 0

c  1-1 --> 0
c    (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0 ∧ -p_950) -> (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧ -b^{19, 51}_0)
c  in CNF:
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_2
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_1
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_0
c  in DIMACS:
 13517  13518 -13519  950 -13520 0
 13517  13518 -13519  950 -13521 0
 13517  13518 -13519  950 -13522 0

c  0-1 --> -1
c    (-b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧ -p_950) -> ( b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0)
c  in CNF:
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨  b^{19, 51}_2
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_1
c     b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨  b^{19, 51}_0
c  in DIMACS:
 13517  13518  13519  950  13520 0
 13517  13518  13519  950 -13521 0
 13517  13518  13519  950  13522 0

c  -1-1 --> -2
c    ( b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧  b^{19, 50}_0 ∧ -p_950) -> ( b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0)
c  in CNF:
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨  b^{19, 51}_2
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨  b^{19, 51}_1
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨  p_950 ∨ -b^{19, 51}_0
c  in DIMACS:
-13517  13518 -13519  950  13520 0
-13517  13518 -13519  950  13521 0
-13517  13518 -13519  950 -13522 0

c  -2-1 --> break 
c    ( b^{19, 50}_2 ∧  b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨  b^{19, 50}_0 ∨  p_950 ∨ break
c  in DIMACS:
-13517 -13518  13519  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 50}_2 ∧ -b^{19, 50}_1 ∧ -b^{19, 50}_0 ∧ true) 
c  in CNF:
c    -b^{19, 50}_2 ∨  b^{19, 50}_1 ∨  b^{19, 50}_0 ∨ false 
c  in DIMACS:
-13517  13518  13519  0

c  3 does not represent an automaton state.
c    -(-b^{19, 50}_2 ∧  b^{19, 50}_1 ∧  b^{19, 50}_0 ∧ true) 
c  in CNF:
c     b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ false 
c  in DIMACS:
 13517 -13518 -13519  0
c  -3 does not represent an automaton state.
c    -( b^{19, 50}_2 ∧  b^{19, 50}_1 ∧  b^{19, 50}_0 ∧ true) 
c  in CNF:
c    -b^{19, 50}_2 ∨ -b^{19, 50}_1 ∨ -b^{19, 50}_0 ∨ false 
c  in DIMACS:
-13517 -13518 -13519  0

c i = 51
c  -2+1 --> -1
c    ( b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧  p_969) -> ( b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0)
c  in CNF:
c    -b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨  b^{19, 52}_2
c    -b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_1
c    -b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨  b^{19, 52}_0
c  in DIMACS:
-13520 -13521  13522 -969  13523 0
-13520 -13521  13522 -969 -13524 0
-13520 -13521  13522 -969  13525 0

c  -1+1 --> 0
c    ( b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0 ∧  p_969) -> (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧ -b^{19, 52}_0)
c  in CNF:
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_2
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_1
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_0
c  in DIMACS:
-13520  13521 -13522 -969 -13523 0
-13520  13521 -13522 -969 -13524 0
-13520  13521 -13522 -969 -13525 0

c  0+1 --> 1
c    (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧  p_969) -> (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0)
c  in CNF:
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_2
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_1
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨  b^{19, 52}_0
c  in DIMACS:
 13520  13521  13522 -969 -13523 0
 13520  13521  13522 -969 -13524 0
 13520  13521  13522 -969  13525 0

c  1+1 --> 2
c    (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0 ∧  p_969) -> (-b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0)
c  in CNF:
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_2
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨  b^{19, 52}_1
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ -p_969 ∨ -b^{19, 52}_0
c  in DIMACS:
 13520  13521 -13522 -969 -13523 0
 13520  13521 -13522 -969  13524 0
 13520  13521 -13522 -969 -13525 0

c  2+1 --> break 
c    (-b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧  p_969) -> break
c  in CNF:
c     b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 13520 -13521  13522 -969 1162 0


c  2-1 --> 1
c    (-b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧ -p_969) -> (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0)
c  in CNF:
c     b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_2
c     b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_1
c     b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨  b^{19, 52}_0
c  in DIMACS:
 13520 -13521  13522  969 -13523 0
 13520 -13521  13522  969 -13524 0
 13520 -13521  13522  969  13525 0

c  1-1 --> 0
c    (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0 ∧ -p_969) -> (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧ -b^{19, 52}_0)
c  in CNF:
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_2
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_1
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_0
c  in DIMACS:
 13520  13521 -13522  969 -13523 0
 13520  13521 -13522  969 -13524 0
 13520  13521 -13522  969 -13525 0

c  0-1 --> -1
c    (-b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧ -p_969) -> ( b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0)
c  in CNF:
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨  b^{19, 52}_2
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_1
c     b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨  b^{19, 52}_0
c  in DIMACS:
 13520  13521  13522  969  13523 0
 13520  13521  13522  969 -13524 0
 13520  13521  13522  969  13525 0

c  -1-1 --> -2
c    ( b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧  b^{19, 51}_0 ∧ -p_969) -> ( b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0)
c  in CNF:
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨  b^{19, 52}_2
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨  b^{19, 52}_1
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨  p_969 ∨ -b^{19, 52}_0
c  in DIMACS:
-13520  13521 -13522  969  13523 0
-13520  13521 -13522  969  13524 0
-13520  13521 -13522  969 -13525 0

c  -2-1 --> break 
c    ( b^{19, 51}_2 ∧  b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨  b^{19, 51}_0 ∨  p_969 ∨ break
c  in DIMACS:
-13520 -13521  13522  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 51}_2 ∧ -b^{19, 51}_1 ∧ -b^{19, 51}_0 ∧ true) 
c  in CNF:
c    -b^{19, 51}_2 ∨  b^{19, 51}_1 ∨  b^{19, 51}_0 ∨ false 
c  in DIMACS:
-13520  13521  13522  0

c  3 does not represent an automaton state.
c    -(-b^{19, 51}_2 ∧  b^{19, 51}_1 ∧  b^{19, 51}_0 ∧ true) 
c  in CNF:
c     b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ false 
c  in DIMACS:
 13520 -13521 -13522  0
c  -3 does not represent an automaton state.
c    -( b^{19, 51}_2 ∧  b^{19, 51}_1 ∧  b^{19, 51}_0 ∧ true) 
c  in CNF:
c    -b^{19, 51}_2 ∨ -b^{19, 51}_1 ∨ -b^{19, 51}_0 ∨ false 
c  in DIMACS:
-13520 -13521 -13522  0

c i = 52
c  -2+1 --> -1
c    ( b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧  p_988) -> ( b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0)
c  in CNF:
c    -b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨  b^{19, 53}_2
c    -b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_1
c    -b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨  b^{19, 53}_0
c  in DIMACS:
-13523 -13524  13525 -988  13526 0
-13523 -13524  13525 -988 -13527 0
-13523 -13524  13525 -988  13528 0

c  -1+1 --> 0
c    ( b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0 ∧  p_988) -> (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧ -b^{19, 53}_0)
c  in CNF:
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_2
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_1
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_0
c  in DIMACS:
-13523  13524 -13525 -988 -13526 0
-13523  13524 -13525 -988 -13527 0
-13523  13524 -13525 -988 -13528 0

c  0+1 --> 1
c    (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧  p_988) -> (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0)
c  in CNF:
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_2
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_1
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨  b^{19, 53}_0
c  in DIMACS:
 13523  13524  13525 -988 -13526 0
 13523  13524  13525 -988 -13527 0
 13523  13524  13525 -988  13528 0

c  1+1 --> 2
c    (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0 ∧  p_988) -> (-b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0)
c  in CNF:
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_2
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨  b^{19, 53}_1
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ -p_988 ∨ -b^{19, 53}_0
c  in DIMACS:
 13523  13524 -13525 -988 -13526 0
 13523  13524 -13525 -988  13527 0
 13523  13524 -13525 -988 -13528 0

c  2+1 --> break 
c    (-b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧  p_988) -> break
c  in CNF:
c     b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 13523 -13524  13525 -988 1162 0


c  2-1 --> 1
c    (-b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧ -p_988) -> (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0)
c  in CNF:
c     b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_2
c     b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_1
c     b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨  b^{19, 53}_0
c  in DIMACS:
 13523 -13524  13525  988 -13526 0
 13523 -13524  13525  988 -13527 0
 13523 -13524  13525  988  13528 0

c  1-1 --> 0
c    (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0 ∧ -p_988) -> (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧ -b^{19, 53}_0)
c  in CNF:
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_2
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_1
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_0
c  in DIMACS:
 13523  13524 -13525  988 -13526 0
 13523  13524 -13525  988 -13527 0
 13523  13524 -13525  988 -13528 0

c  0-1 --> -1
c    (-b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧ -p_988) -> ( b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0)
c  in CNF:
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨  b^{19, 53}_2
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_1
c     b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨  b^{19, 53}_0
c  in DIMACS:
 13523  13524  13525  988  13526 0
 13523  13524  13525  988 -13527 0
 13523  13524  13525  988  13528 0

c  -1-1 --> -2
c    ( b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧  b^{19, 52}_0 ∧ -p_988) -> ( b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0)
c  in CNF:
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨  b^{19, 53}_2
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨  b^{19, 53}_1
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨  p_988 ∨ -b^{19, 53}_0
c  in DIMACS:
-13523  13524 -13525  988  13526 0
-13523  13524 -13525  988  13527 0
-13523  13524 -13525  988 -13528 0

c  -2-1 --> break 
c    ( b^{19, 52}_2 ∧  b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨  b^{19, 52}_0 ∨  p_988 ∨ break
c  in DIMACS:
-13523 -13524  13525  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 52}_2 ∧ -b^{19, 52}_1 ∧ -b^{19, 52}_0 ∧ true) 
c  in CNF:
c    -b^{19, 52}_2 ∨  b^{19, 52}_1 ∨  b^{19, 52}_0 ∨ false 
c  in DIMACS:
-13523  13524  13525  0

c  3 does not represent an automaton state.
c    -(-b^{19, 52}_2 ∧  b^{19, 52}_1 ∧  b^{19, 52}_0 ∧ true) 
c  in CNF:
c     b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ false 
c  in DIMACS:
 13523 -13524 -13525  0
c  -3 does not represent an automaton state.
c    -( b^{19, 52}_2 ∧  b^{19, 52}_1 ∧  b^{19, 52}_0 ∧ true) 
c  in CNF:
c    -b^{19, 52}_2 ∨ -b^{19, 52}_1 ∨ -b^{19, 52}_0 ∨ false 
c  in DIMACS:
-13523 -13524 -13525  0

c i = 53
c  -2+1 --> -1
c    ( b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧  p_1007) -> ( b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0)
c  in CNF:
c    -b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨  b^{19, 54}_2
c    -b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_1
c    -b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨  b^{19, 54}_0
c  in DIMACS:
-13526 -13527  13528 -1007  13529 0
-13526 -13527  13528 -1007 -13530 0
-13526 -13527  13528 -1007  13531 0

c  -1+1 --> 0
c    ( b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0 ∧  p_1007) -> (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧ -b^{19, 54}_0)
c  in CNF:
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_2
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_1
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_0
c  in DIMACS:
-13526  13527 -13528 -1007 -13529 0
-13526  13527 -13528 -1007 -13530 0
-13526  13527 -13528 -1007 -13531 0

c  0+1 --> 1
c    (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧  p_1007) -> (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0)
c  in CNF:
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_2
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_1
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨  b^{19, 54}_0
c  in DIMACS:
 13526  13527  13528 -1007 -13529 0
 13526  13527  13528 -1007 -13530 0
 13526  13527  13528 -1007  13531 0

c  1+1 --> 2
c    (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0 ∧  p_1007) -> (-b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0)
c  in CNF:
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_2
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨  b^{19, 54}_1
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ -p_1007 ∨ -b^{19, 54}_0
c  in DIMACS:
 13526  13527 -13528 -1007 -13529 0
 13526  13527 -13528 -1007  13530 0
 13526  13527 -13528 -1007 -13531 0

c  2+1 --> break 
c    (-b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧  p_1007) -> break
c  in CNF:
c     b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ -p_1007 ∨ break
c  in DIMACS:
 13526 -13527  13528 -1007 1162 0


c  2-1 --> 1
c    (-b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧ -p_1007) -> (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0)
c  in CNF:
c     b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_2
c     b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_1
c     b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨  b^{19, 54}_0
c  in DIMACS:
 13526 -13527  13528  1007 -13529 0
 13526 -13527  13528  1007 -13530 0
 13526 -13527  13528  1007  13531 0

c  1-1 --> 0
c    (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0 ∧ -p_1007) -> (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧ -b^{19, 54}_0)
c  in CNF:
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_2
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_1
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_0
c  in DIMACS:
 13526  13527 -13528  1007 -13529 0
 13526  13527 -13528  1007 -13530 0
 13526  13527 -13528  1007 -13531 0

c  0-1 --> -1
c    (-b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧ -p_1007) -> ( b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0)
c  in CNF:
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨  b^{19, 54}_2
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_1
c     b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨  b^{19, 54}_0
c  in DIMACS:
 13526  13527  13528  1007  13529 0
 13526  13527  13528  1007 -13530 0
 13526  13527  13528  1007  13531 0

c  -1-1 --> -2
c    ( b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧  b^{19, 53}_0 ∧ -p_1007) -> ( b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0)
c  in CNF:
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨  b^{19, 54}_2
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨  b^{19, 54}_1
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨  p_1007 ∨ -b^{19, 54}_0
c  in DIMACS:
-13526  13527 -13528  1007  13529 0
-13526  13527 -13528  1007  13530 0
-13526  13527 -13528  1007 -13531 0

c  -2-1 --> break 
c    ( b^{19, 53}_2 ∧  b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧ -p_1007) -> break
c  in CNF:
c    -b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨  b^{19, 53}_0 ∨  p_1007 ∨ break
c  in DIMACS:
-13526 -13527  13528  1007 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 53}_2 ∧ -b^{19, 53}_1 ∧ -b^{19, 53}_0 ∧ true) 
c  in CNF:
c    -b^{19, 53}_2 ∨  b^{19, 53}_1 ∨  b^{19, 53}_0 ∨ false 
c  in DIMACS:
-13526  13527  13528  0

c  3 does not represent an automaton state.
c    -(-b^{19, 53}_2 ∧  b^{19, 53}_1 ∧  b^{19, 53}_0 ∧ true) 
c  in CNF:
c     b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ false 
c  in DIMACS:
 13526 -13527 -13528  0
c  -3 does not represent an automaton state.
c    -( b^{19, 53}_2 ∧  b^{19, 53}_1 ∧  b^{19, 53}_0 ∧ true) 
c  in CNF:
c    -b^{19, 53}_2 ∨ -b^{19, 53}_1 ∨ -b^{19, 53}_0 ∨ false 
c  in DIMACS:
-13526 -13527 -13528  0

c i = 54
c  -2+1 --> -1
c    ( b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧  p_1026) -> ( b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0)
c  in CNF:
c    -b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨  b^{19, 55}_2
c    -b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_1
c    -b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨  b^{19, 55}_0
c  in DIMACS:
-13529 -13530  13531 -1026  13532 0
-13529 -13530  13531 -1026 -13533 0
-13529 -13530  13531 -1026  13534 0

c  -1+1 --> 0
c    ( b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0 ∧  p_1026) -> (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧ -b^{19, 55}_0)
c  in CNF:
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_2
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_1
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_0
c  in DIMACS:
-13529  13530 -13531 -1026 -13532 0
-13529  13530 -13531 -1026 -13533 0
-13529  13530 -13531 -1026 -13534 0

c  0+1 --> 1
c    (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧  p_1026) -> (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0)
c  in CNF:
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_2
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_1
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨  b^{19, 55}_0
c  in DIMACS:
 13529  13530  13531 -1026 -13532 0
 13529  13530  13531 -1026 -13533 0
 13529  13530  13531 -1026  13534 0

c  1+1 --> 2
c    (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0 ∧  p_1026) -> (-b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0)
c  in CNF:
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_2
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨  b^{19, 55}_1
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ -p_1026 ∨ -b^{19, 55}_0
c  in DIMACS:
 13529  13530 -13531 -1026 -13532 0
 13529  13530 -13531 -1026  13533 0
 13529  13530 -13531 -1026 -13534 0

c  2+1 --> break 
c    (-b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 13529 -13530  13531 -1026 1162 0


c  2-1 --> 1
c    (-b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧ -p_1026) -> (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0)
c  in CNF:
c     b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_2
c     b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_1
c     b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨  b^{19, 55}_0
c  in DIMACS:
 13529 -13530  13531  1026 -13532 0
 13529 -13530  13531  1026 -13533 0
 13529 -13530  13531  1026  13534 0

c  1-1 --> 0
c    (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0 ∧ -p_1026) -> (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧ -b^{19, 55}_0)
c  in CNF:
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_2
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_1
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_0
c  in DIMACS:
 13529  13530 -13531  1026 -13532 0
 13529  13530 -13531  1026 -13533 0
 13529  13530 -13531  1026 -13534 0

c  0-1 --> -1
c    (-b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧ -p_1026) -> ( b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0)
c  in CNF:
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨  b^{19, 55}_2
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_1
c     b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨  b^{19, 55}_0
c  in DIMACS:
 13529  13530  13531  1026  13532 0
 13529  13530  13531  1026 -13533 0
 13529  13530  13531  1026  13534 0

c  -1-1 --> -2
c    ( b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧  b^{19, 54}_0 ∧ -p_1026) -> ( b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0)
c  in CNF:
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨  b^{19, 55}_2
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨  b^{19, 55}_1
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨  p_1026 ∨ -b^{19, 55}_0
c  in DIMACS:
-13529  13530 -13531  1026  13532 0
-13529  13530 -13531  1026  13533 0
-13529  13530 -13531  1026 -13534 0

c  -2-1 --> break 
c    ( b^{19, 54}_2 ∧  b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨  b^{19, 54}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-13529 -13530  13531  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 54}_2 ∧ -b^{19, 54}_1 ∧ -b^{19, 54}_0 ∧ true) 
c  in CNF:
c    -b^{19, 54}_2 ∨  b^{19, 54}_1 ∨  b^{19, 54}_0 ∨ false 
c  in DIMACS:
-13529  13530  13531  0

c  3 does not represent an automaton state.
c    -(-b^{19, 54}_2 ∧  b^{19, 54}_1 ∧  b^{19, 54}_0 ∧ true) 
c  in CNF:
c     b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ false 
c  in DIMACS:
 13529 -13530 -13531  0
c  -3 does not represent an automaton state.
c    -( b^{19, 54}_2 ∧  b^{19, 54}_1 ∧  b^{19, 54}_0 ∧ true) 
c  in CNF:
c    -b^{19, 54}_2 ∨ -b^{19, 54}_1 ∨ -b^{19, 54}_0 ∨ false 
c  in DIMACS:
-13529 -13530 -13531  0

c i = 55
c  -2+1 --> -1
c    ( b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧  p_1045) -> ( b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0)
c  in CNF:
c    -b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨  b^{19, 56}_2
c    -b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_1
c    -b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨  b^{19, 56}_0
c  in DIMACS:
-13532 -13533  13534 -1045  13535 0
-13532 -13533  13534 -1045 -13536 0
-13532 -13533  13534 -1045  13537 0

c  -1+1 --> 0
c    ( b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0 ∧  p_1045) -> (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧ -b^{19, 56}_0)
c  in CNF:
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_2
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_1
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_0
c  in DIMACS:
-13532  13533 -13534 -1045 -13535 0
-13532  13533 -13534 -1045 -13536 0
-13532  13533 -13534 -1045 -13537 0

c  0+1 --> 1
c    (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧  p_1045) -> (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0)
c  in CNF:
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_2
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_1
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨  b^{19, 56}_0
c  in DIMACS:
 13532  13533  13534 -1045 -13535 0
 13532  13533  13534 -1045 -13536 0
 13532  13533  13534 -1045  13537 0

c  1+1 --> 2
c    (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0 ∧  p_1045) -> (-b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0)
c  in CNF:
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_2
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨  b^{19, 56}_1
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ -p_1045 ∨ -b^{19, 56}_0
c  in DIMACS:
 13532  13533 -13534 -1045 -13535 0
 13532  13533 -13534 -1045  13536 0
 13532  13533 -13534 -1045 -13537 0

c  2+1 --> break 
c    (-b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 13532 -13533  13534 -1045 1162 0


c  2-1 --> 1
c    (-b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧ -p_1045) -> (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0)
c  in CNF:
c     b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_2
c     b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_1
c     b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨  b^{19, 56}_0
c  in DIMACS:
 13532 -13533  13534  1045 -13535 0
 13532 -13533  13534  1045 -13536 0
 13532 -13533  13534  1045  13537 0

c  1-1 --> 0
c    (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0 ∧ -p_1045) -> (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧ -b^{19, 56}_0)
c  in CNF:
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_2
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_1
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_0
c  in DIMACS:
 13532  13533 -13534  1045 -13535 0
 13532  13533 -13534  1045 -13536 0
 13532  13533 -13534  1045 -13537 0

c  0-1 --> -1
c    (-b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧ -p_1045) -> ( b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0)
c  in CNF:
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨  b^{19, 56}_2
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_1
c     b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨  b^{19, 56}_0
c  in DIMACS:
 13532  13533  13534  1045  13535 0
 13532  13533  13534  1045 -13536 0
 13532  13533  13534  1045  13537 0

c  -1-1 --> -2
c    ( b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧  b^{19, 55}_0 ∧ -p_1045) -> ( b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0)
c  in CNF:
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨  b^{19, 56}_2
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨  b^{19, 56}_1
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨  p_1045 ∨ -b^{19, 56}_0
c  in DIMACS:
-13532  13533 -13534  1045  13535 0
-13532  13533 -13534  1045  13536 0
-13532  13533 -13534  1045 -13537 0

c  -2-1 --> break 
c    ( b^{19, 55}_2 ∧  b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨  b^{19, 55}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-13532 -13533  13534  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 55}_2 ∧ -b^{19, 55}_1 ∧ -b^{19, 55}_0 ∧ true) 
c  in CNF:
c    -b^{19, 55}_2 ∨  b^{19, 55}_1 ∨  b^{19, 55}_0 ∨ false 
c  in DIMACS:
-13532  13533  13534  0

c  3 does not represent an automaton state.
c    -(-b^{19, 55}_2 ∧  b^{19, 55}_1 ∧  b^{19, 55}_0 ∧ true) 
c  in CNF:
c     b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ false 
c  in DIMACS:
 13532 -13533 -13534  0
c  -3 does not represent an automaton state.
c    -( b^{19, 55}_2 ∧  b^{19, 55}_1 ∧  b^{19, 55}_0 ∧ true) 
c  in CNF:
c    -b^{19, 55}_2 ∨ -b^{19, 55}_1 ∨ -b^{19, 55}_0 ∨ false 
c  in DIMACS:
-13532 -13533 -13534  0

c i = 56
c  -2+1 --> -1
c    ( b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧  p_1064) -> ( b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0)
c  in CNF:
c    -b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨  b^{19, 57}_2
c    -b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_1
c    -b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨  b^{19, 57}_0
c  in DIMACS:
-13535 -13536  13537 -1064  13538 0
-13535 -13536  13537 -1064 -13539 0
-13535 -13536  13537 -1064  13540 0

c  -1+1 --> 0
c    ( b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0 ∧  p_1064) -> (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧ -b^{19, 57}_0)
c  in CNF:
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_2
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_1
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_0
c  in DIMACS:
-13535  13536 -13537 -1064 -13538 0
-13535  13536 -13537 -1064 -13539 0
-13535  13536 -13537 -1064 -13540 0

c  0+1 --> 1
c    (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧  p_1064) -> (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0)
c  in CNF:
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_2
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_1
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨  b^{19, 57}_0
c  in DIMACS:
 13535  13536  13537 -1064 -13538 0
 13535  13536  13537 -1064 -13539 0
 13535  13536  13537 -1064  13540 0

c  1+1 --> 2
c    (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0 ∧  p_1064) -> (-b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0)
c  in CNF:
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_2
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨  b^{19, 57}_1
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ -p_1064 ∨ -b^{19, 57}_0
c  in DIMACS:
 13535  13536 -13537 -1064 -13538 0
 13535  13536 -13537 -1064  13539 0
 13535  13536 -13537 -1064 -13540 0

c  2+1 --> break 
c    (-b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 13535 -13536  13537 -1064 1162 0


c  2-1 --> 1
c    (-b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧ -p_1064) -> (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0)
c  in CNF:
c     b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_2
c     b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_1
c     b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨  b^{19, 57}_0
c  in DIMACS:
 13535 -13536  13537  1064 -13538 0
 13535 -13536  13537  1064 -13539 0
 13535 -13536  13537  1064  13540 0

c  1-1 --> 0
c    (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0 ∧ -p_1064) -> (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧ -b^{19, 57}_0)
c  in CNF:
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_2
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_1
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_0
c  in DIMACS:
 13535  13536 -13537  1064 -13538 0
 13535  13536 -13537  1064 -13539 0
 13535  13536 -13537  1064 -13540 0

c  0-1 --> -1
c    (-b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧ -p_1064) -> ( b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0)
c  in CNF:
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨  b^{19, 57}_2
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_1
c     b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨  b^{19, 57}_0
c  in DIMACS:
 13535  13536  13537  1064  13538 0
 13535  13536  13537  1064 -13539 0
 13535  13536  13537  1064  13540 0

c  -1-1 --> -2
c    ( b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧  b^{19, 56}_0 ∧ -p_1064) -> ( b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0)
c  in CNF:
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨  b^{19, 57}_2
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨  b^{19, 57}_1
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨  p_1064 ∨ -b^{19, 57}_0
c  in DIMACS:
-13535  13536 -13537  1064  13538 0
-13535  13536 -13537  1064  13539 0
-13535  13536 -13537  1064 -13540 0

c  -2-1 --> break 
c    ( b^{19, 56}_2 ∧  b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨  b^{19, 56}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-13535 -13536  13537  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 56}_2 ∧ -b^{19, 56}_1 ∧ -b^{19, 56}_0 ∧ true) 
c  in CNF:
c    -b^{19, 56}_2 ∨  b^{19, 56}_1 ∨  b^{19, 56}_0 ∨ false 
c  in DIMACS:
-13535  13536  13537  0

c  3 does not represent an automaton state.
c    -(-b^{19, 56}_2 ∧  b^{19, 56}_1 ∧  b^{19, 56}_0 ∧ true) 
c  in CNF:
c     b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ false 
c  in DIMACS:
 13535 -13536 -13537  0
c  -3 does not represent an automaton state.
c    -( b^{19, 56}_2 ∧  b^{19, 56}_1 ∧  b^{19, 56}_0 ∧ true) 
c  in CNF:
c    -b^{19, 56}_2 ∨ -b^{19, 56}_1 ∨ -b^{19, 56}_0 ∨ false 
c  in DIMACS:
-13535 -13536 -13537  0

c i = 57
c  -2+1 --> -1
c    ( b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧  p_1083) -> ( b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0)
c  in CNF:
c    -b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨  b^{19, 58}_2
c    -b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_1
c    -b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨  b^{19, 58}_0
c  in DIMACS:
-13538 -13539  13540 -1083  13541 0
-13538 -13539  13540 -1083 -13542 0
-13538 -13539  13540 -1083  13543 0

c  -1+1 --> 0
c    ( b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0 ∧  p_1083) -> (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧ -b^{19, 58}_0)
c  in CNF:
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_2
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_1
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_0
c  in DIMACS:
-13538  13539 -13540 -1083 -13541 0
-13538  13539 -13540 -1083 -13542 0
-13538  13539 -13540 -1083 -13543 0

c  0+1 --> 1
c    (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧  p_1083) -> (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0)
c  in CNF:
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_2
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_1
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨  b^{19, 58}_0
c  in DIMACS:
 13538  13539  13540 -1083 -13541 0
 13538  13539  13540 -1083 -13542 0
 13538  13539  13540 -1083  13543 0

c  1+1 --> 2
c    (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0 ∧  p_1083) -> (-b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0)
c  in CNF:
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_2
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨  b^{19, 58}_1
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ -p_1083 ∨ -b^{19, 58}_0
c  in DIMACS:
 13538  13539 -13540 -1083 -13541 0
 13538  13539 -13540 -1083  13542 0
 13538  13539 -13540 -1083 -13543 0

c  2+1 --> break 
c    (-b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧  p_1083) -> break
c  in CNF:
c     b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ -p_1083 ∨ break
c  in DIMACS:
 13538 -13539  13540 -1083 1162 0


c  2-1 --> 1
c    (-b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧ -p_1083) -> (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0)
c  in CNF:
c     b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_2
c     b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_1
c     b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨  b^{19, 58}_0
c  in DIMACS:
 13538 -13539  13540  1083 -13541 0
 13538 -13539  13540  1083 -13542 0
 13538 -13539  13540  1083  13543 0

c  1-1 --> 0
c    (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0 ∧ -p_1083) -> (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧ -b^{19, 58}_0)
c  in CNF:
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_2
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_1
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_0
c  in DIMACS:
 13538  13539 -13540  1083 -13541 0
 13538  13539 -13540  1083 -13542 0
 13538  13539 -13540  1083 -13543 0

c  0-1 --> -1
c    (-b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧ -p_1083) -> ( b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0)
c  in CNF:
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨  b^{19, 58}_2
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_1
c     b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨  b^{19, 58}_0
c  in DIMACS:
 13538  13539  13540  1083  13541 0
 13538  13539  13540  1083 -13542 0
 13538  13539  13540  1083  13543 0

c  -1-1 --> -2
c    ( b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧  b^{19, 57}_0 ∧ -p_1083) -> ( b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0)
c  in CNF:
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨  b^{19, 58}_2
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨  b^{19, 58}_1
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨  p_1083 ∨ -b^{19, 58}_0
c  in DIMACS:
-13538  13539 -13540  1083  13541 0
-13538  13539 -13540  1083  13542 0
-13538  13539 -13540  1083 -13543 0

c  -2-1 --> break 
c    ( b^{19, 57}_2 ∧  b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧ -p_1083) -> break
c  in CNF:
c    -b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨  b^{19, 57}_0 ∨  p_1083 ∨ break
c  in DIMACS:
-13538 -13539  13540  1083 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 57}_2 ∧ -b^{19, 57}_1 ∧ -b^{19, 57}_0 ∧ true) 
c  in CNF:
c    -b^{19, 57}_2 ∨  b^{19, 57}_1 ∨  b^{19, 57}_0 ∨ false 
c  in DIMACS:
-13538  13539  13540  0

c  3 does not represent an automaton state.
c    -(-b^{19, 57}_2 ∧  b^{19, 57}_1 ∧  b^{19, 57}_0 ∧ true) 
c  in CNF:
c     b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ false 
c  in DIMACS:
 13538 -13539 -13540  0
c  -3 does not represent an automaton state.
c    -( b^{19, 57}_2 ∧  b^{19, 57}_1 ∧  b^{19, 57}_0 ∧ true) 
c  in CNF:
c    -b^{19, 57}_2 ∨ -b^{19, 57}_1 ∨ -b^{19, 57}_0 ∨ false 
c  in DIMACS:
-13538 -13539 -13540  0

c i = 58
c  -2+1 --> -1
c    ( b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧  p_1102) -> ( b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0)
c  in CNF:
c    -b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨  b^{19, 59}_2
c    -b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_1
c    -b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨  b^{19, 59}_0
c  in DIMACS:
-13541 -13542  13543 -1102  13544 0
-13541 -13542  13543 -1102 -13545 0
-13541 -13542  13543 -1102  13546 0

c  -1+1 --> 0
c    ( b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0 ∧  p_1102) -> (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧ -b^{19, 59}_0)
c  in CNF:
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_2
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_1
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_0
c  in DIMACS:
-13541  13542 -13543 -1102 -13544 0
-13541  13542 -13543 -1102 -13545 0
-13541  13542 -13543 -1102 -13546 0

c  0+1 --> 1
c    (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧  p_1102) -> (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0)
c  in CNF:
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_2
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_1
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨  b^{19, 59}_0
c  in DIMACS:
 13541  13542  13543 -1102 -13544 0
 13541  13542  13543 -1102 -13545 0
 13541  13542  13543 -1102  13546 0

c  1+1 --> 2
c    (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0 ∧  p_1102) -> (-b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0)
c  in CNF:
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_2
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨  b^{19, 59}_1
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ -p_1102 ∨ -b^{19, 59}_0
c  in DIMACS:
 13541  13542 -13543 -1102 -13544 0
 13541  13542 -13543 -1102  13545 0
 13541  13542 -13543 -1102 -13546 0

c  2+1 --> break 
c    (-b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 13541 -13542  13543 -1102 1162 0


c  2-1 --> 1
c    (-b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧ -p_1102) -> (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0)
c  in CNF:
c     b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_2
c     b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_1
c     b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨  b^{19, 59}_0
c  in DIMACS:
 13541 -13542  13543  1102 -13544 0
 13541 -13542  13543  1102 -13545 0
 13541 -13542  13543  1102  13546 0

c  1-1 --> 0
c    (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0 ∧ -p_1102) -> (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧ -b^{19, 59}_0)
c  in CNF:
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_2
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_1
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_0
c  in DIMACS:
 13541  13542 -13543  1102 -13544 0
 13541  13542 -13543  1102 -13545 0
 13541  13542 -13543  1102 -13546 0

c  0-1 --> -1
c    (-b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧ -p_1102) -> ( b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0)
c  in CNF:
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨  b^{19, 59}_2
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_1
c     b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨  b^{19, 59}_0
c  in DIMACS:
 13541  13542  13543  1102  13544 0
 13541  13542  13543  1102 -13545 0
 13541  13542  13543  1102  13546 0

c  -1-1 --> -2
c    ( b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧  b^{19, 58}_0 ∧ -p_1102) -> ( b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0)
c  in CNF:
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨  b^{19, 59}_2
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨  b^{19, 59}_1
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨  p_1102 ∨ -b^{19, 59}_0
c  in DIMACS:
-13541  13542 -13543  1102  13544 0
-13541  13542 -13543  1102  13545 0
-13541  13542 -13543  1102 -13546 0

c  -2-1 --> break 
c    ( b^{19, 58}_2 ∧  b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨  b^{19, 58}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-13541 -13542  13543  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 58}_2 ∧ -b^{19, 58}_1 ∧ -b^{19, 58}_0 ∧ true) 
c  in CNF:
c    -b^{19, 58}_2 ∨  b^{19, 58}_1 ∨  b^{19, 58}_0 ∨ false 
c  in DIMACS:
-13541  13542  13543  0

c  3 does not represent an automaton state.
c    -(-b^{19, 58}_2 ∧  b^{19, 58}_1 ∧  b^{19, 58}_0 ∧ true) 
c  in CNF:
c     b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ false 
c  in DIMACS:
 13541 -13542 -13543  0
c  -3 does not represent an automaton state.
c    -( b^{19, 58}_2 ∧  b^{19, 58}_1 ∧  b^{19, 58}_0 ∧ true) 
c  in CNF:
c    -b^{19, 58}_2 ∨ -b^{19, 58}_1 ∨ -b^{19, 58}_0 ∨ false 
c  in DIMACS:
-13541 -13542 -13543  0

c i = 59
c  -2+1 --> -1
c    ( b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧  p_1121) -> ( b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0)
c  in CNF:
c    -b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨  b^{19, 60}_2
c    -b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_1
c    -b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨  b^{19, 60}_0
c  in DIMACS:
-13544 -13545  13546 -1121  13547 0
-13544 -13545  13546 -1121 -13548 0
-13544 -13545  13546 -1121  13549 0

c  -1+1 --> 0
c    ( b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0 ∧  p_1121) -> (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧ -b^{19, 60}_0)
c  in CNF:
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_2
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_1
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_0
c  in DIMACS:
-13544  13545 -13546 -1121 -13547 0
-13544  13545 -13546 -1121 -13548 0
-13544  13545 -13546 -1121 -13549 0

c  0+1 --> 1
c    (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧  p_1121) -> (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0)
c  in CNF:
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_2
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_1
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨  b^{19, 60}_0
c  in DIMACS:
 13544  13545  13546 -1121 -13547 0
 13544  13545  13546 -1121 -13548 0
 13544  13545  13546 -1121  13549 0

c  1+1 --> 2
c    (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0 ∧  p_1121) -> (-b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0)
c  in CNF:
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_2
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨  b^{19, 60}_1
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ -p_1121 ∨ -b^{19, 60}_0
c  in DIMACS:
 13544  13545 -13546 -1121 -13547 0
 13544  13545 -13546 -1121  13548 0
 13544  13545 -13546 -1121 -13549 0

c  2+1 --> break 
c    (-b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧  p_1121) -> break
c  in CNF:
c     b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ -p_1121 ∨ break
c  in DIMACS:
 13544 -13545  13546 -1121 1162 0


c  2-1 --> 1
c    (-b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧ -p_1121) -> (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0)
c  in CNF:
c     b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_2
c     b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_1
c     b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨  b^{19, 60}_0
c  in DIMACS:
 13544 -13545  13546  1121 -13547 0
 13544 -13545  13546  1121 -13548 0
 13544 -13545  13546  1121  13549 0

c  1-1 --> 0
c    (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0 ∧ -p_1121) -> (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧ -b^{19, 60}_0)
c  in CNF:
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_2
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_1
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_0
c  in DIMACS:
 13544  13545 -13546  1121 -13547 0
 13544  13545 -13546  1121 -13548 0
 13544  13545 -13546  1121 -13549 0

c  0-1 --> -1
c    (-b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧ -p_1121) -> ( b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0)
c  in CNF:
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨  b^{19, 60}_2
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_1
c     b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨  b^{19, 60}_0
c  in DIMACS:
 13544  13545  13546  1121  13547 0
 13544  13545  13546  1121 -13548 0
 13544  13545  13546  1121  13549 0

c  -1-1 --> -2
c    ( b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧  b^{19, 59}_0 ∧ -p_1121) -> ( b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0)
c  in CNF:
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨  b^{19, 60}_2
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨  b^{19, 60}_1
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨  p_1121 ∨ -b^{19, 60}_0
c  in DIMACS:
-13544  13545 -13546  1121  13547 0
-13544  13545 -13546  1121  13548 0
-13544  13545 -13546  1121 -13549 0

c  -2-1 --> break 
c    ( b^{19, 59}_2 ∧  b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧ -p_1121) -> break
c  in CNF:
c    -b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨  b^{19, 59}_0 ∨  p_1121 ∨ break
c  in DIMACS:
-13544 -13545  13546  1121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 59}_2 ∧ -b^{19, 59}_1 ∧ -b^{19, 59}_0 ∧ true) 
c  in CNF:
c    -b^{19, 59}_2 ∨  b^{19, 59}_1 ∨  b^{19, 59}_0 ∨ false 
c  in DIMACS:
-13544  13545  13546  0

c  3 does not represent an automaton state.
c    -(-b^{19, 59}_2 ∧  b^{19, 59}_1 ∧  b^{19, 59}_0 ∧ true) 
c  in CNF:
c     b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ false 
c  in DIMACS:
 13544 -13545 -13546  0
c  -3 does not represent an automaton state.
c    -( b^{19, 59}_2 ∧  b^{19, 59}_1 ∧  b^{19, 59}_0 ∧ true) 
c  in CNF:
c    -b^{19, 59}_2 ∨ -b^{19, 59}_1 ∨ -b^{19, 59}_0 ∨ false 
c  in DIMACS:
-13544 -13545 -13546  0

c i = 60
c  -2+1 --> -1
c    ( b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧  p_1140) -> ( b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0)
c  in CNF:
c    -b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨  b^{19, 61}_2
c    -b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_1
c    -b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨  b^{19, 61}_0
c  in DIMACS:
-13547 -13548  13549 -1140  13550 0
-13547 -13548  13549 -1140 -13551 0
-13547 -13548  13549 -1140  13552 0

c  -1+1 --> 0
c    ( b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0 ∧  p_1140) -> (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧ -b^{19, 61}_0)
c  in CNF:
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_2
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_1
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_0
c  in DIMACS:
-13547  13548 -13549 -1140 -13550 0
-13547  13548 -13549 -1140 -13551 0
-13547  13548 -13549 -1140 -13552 0

c  0+1 --> 1
c    (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧  p_1140) -> (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0)
c  in CNF:
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_2
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_1
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨  b^{19, 61}_0
c  in DIMACS:
 13547  13548  13549 -1140 -13550 0
 13547  13548  13549 -1140 -13551 0
 13547  13548  13549 -1140  13552 0

c  1+1 --> 2
c    (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0 ∧  p_1140) -> (-b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0)
c  in CNF:
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_2
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨  b^{19, 61}_1
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ -p_1140 ∨ -b^{19, 61}_0
c  in DIMACS:
 13547  13548 -13549 -1140 -13550 0
 13547  13548 -13549 -1140  13551 0
 13547  13548 -13549 -1140 -13552 0

c  2+1 --> break 
c    (-b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 13547 -13548  13549 -1140 1162 0


c  2-1 --> 1
c    (-b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧ -p_1140) -> (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0)
c  in CNF:
c     b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_2
c     b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_1
c     b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨  b^{19, 61}_0
c  in DIMACS:
 13547 -13548  13549  1140 -13550 0
 13547 -13548  13549  1140 -13551 0
 13547 -13548  13549  1140  13552 0

c  1-1 --> 0
c    (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0 ∧ -p_1140) -> (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧ -b^{19, 61}_0)
c  in CNF:
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_2
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_1
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_0
c  in DIMACS:
 13547  13548 -13549  1140 -13550 0
 13547  13548 -13549  1140 -13551 0
 13547  13548 -13549  1140 -13552 0

c  0-1 --> -1
c    (-b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧ -p_1140) -> ( b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0)
c  in CNF:
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨  b^{19, 61}_2
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_1
c     b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨  b^{19, 61}_0
c  in DIMACS:
 13547  13548  13549  1140  13550 0
 13547  13548  13549  1140 -13551 0
 13547  13548  13549  1140  13552 0

c  -1-1 --> -2
c    ( b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧  b^{19, 60}_0 ∧ -p_1140) -> ( b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0)
c  in CNF:
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨  b^{19, 61}_2
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨  b^{19, 61}_1
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨  p_1140 ∨ -b^{19, 61}_0
c  in DIMACS:
-13547  13548 -13549  1140  13550 0
-13547  13548 -13549  1140  13551 0
-13547  13548 -13549  1140 -13552 0

c  -2-1 --> break 
c    ( b^{19, 60}_2 ∧  b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨  b^{19, 60}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-13547 -13548  13549  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 60}_2 ∧ -b^{19, 60}_1 ∧ -b^{19, 60}_0 ∧ true) 
c  in CNF:
c    -b^{19, 60}_2 ∨  b^{19, 60}_1 ∨  b^{19, 60}_0 ∨ false 
c  in DIMACS:
-13547  13548  13549  0

c  3 does not represent an automaton state.
c    -(-b^{19, 60}_2 ∧  b^{19, 60}_1 ∧  b^{19, 60}_0 ∧ true) 
c  in CNF:
c     b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ false 
c  in DIMACS:
 13547 -13548 -13549  0
c  -3 does not represent an automaton state.
c    -( b^{19, 60}_2 ∧  b^{19, 60}_1 ∧  b^{19, 60}_0 ∧ true) 
c  in CNF:
c    -b^{19, 60}_2 ∨ -b^{19, 60}_1 ∨ -b^{19, 60}_0 ∨ false 
c  in DIMACS:
-13547 -13548 -13549  0

c i = 61
c  -2+1 --> -1
c    ( b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧  p_1159) -> ( b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧  b^{19, 62}_0)
c  in CNF:
c    -b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨  b^{19, 62}_2
c    -b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_1
c    -b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨  b^{19, 62}_0
c  in DIMACS:
-13550 -13551  13552 -1159  13553 0
-13550 -13551  13552 -1159 -13554 0
-13550 -13551  13552 -1159  13555 0

c  -1+1 --> 0
c    ( b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0 ∧  p_1159) -> (-b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧ -b^{19, 62}_0)
c  in CNF:
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_2
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_1
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_0
c  in DIMACS:
-13550  13551 -13552 -1159 -13553 0
-13550  13551 -13552 -1159 -13554 0
-13550  13551 -13552 -1159 -13555 0

c  0+1 --> 1
c    (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧  p_1159) -> (-b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧  b^{19, 62}_0)
c  in CNF:
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_2
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_1
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨  b^{19, 62}_0
c  in DIMACS:
 13550  13551  13552 -1159 -13553 0
 13550  13551  13552 -1159 -13554 0
 13550  13551  13552 -1159  13555 0

c  1+1 --> 2
c    (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0 ∧  p_1159) -> (-b^{19, 62}_2 ∧  b^{19, 62}_1 ∧ -b^{19, 62}_0)
c  in CNF:
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_2
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨  b^{19, 62}_1
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ -p_1159 ∨ -b^{19, 62}_0
c  in DIMACS:
 13550  13551 -13552 -1159 -13553 0
 13550  13551 -13552 -1159  13554 0
 13550  13551 -13552 -1159 -13555 0

c  2+1 --> break 
c    (-b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧  p_1159) -> break
c  in CNF:
c     b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ -p_1159 ∨ break
c  in DIMACS:
 13550 -13551  13552 -1159 1162 0


c  2-1 --> 1
c    (-b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧ -p_1159) -> (-b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧  b^{19, 62}_0)
c  in CNF:
c     b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_2
c     b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_1
c     b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨  b^{19, 62}_0
c  in DIMACS:
 13550 -13551  13552  1159 -13553 0
 13550 -13551  13552  1159 -13554 0
 13550 -13551  13552  1159  13555 0

c  1-1 --> 0
c    (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0 ∧ -p_1159) -> (-b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧ -b^{19, 62}_0)
c  in CNF:
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_2
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_1
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_0
c  in DIMACS:
 13550  13551 -13552  1159 -13553 0
 13550  13551 -13552  1159 -13554 0
 13550  13551 -13552  1159 -13555 0

c  0-1 --> -1
c    (-b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧ -p_1159) -> ( b^{19, 62}_2 ∧ -b^{19, 62}_1 ∧  b^{19, 62}_0)
c  in CNF:
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨  b^{19, 62}_2
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_1
c     b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨  b^{19, 62}_0
c  in DIMACS:
 13550  13551  13552  1159  13553 0
 13550  13551  13552  1159 -13554 0
 13550  13551  13552  1159  13555 0

c  -1-1 --> -2
c    ( b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧  b^{19, 61}_0 ∧ -p_1159) -> ( b^{19, 62}_2 ∧  b^{19, 62}_1 ∧ -b^{19, 62}_0)
c  in CNF:
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨  b^{19, 62}_2
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨  b^{19, 62}_1
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨  p_1159 ∨ -b^{19, 62}_0
c  in DIMACS:
-13550  13551 -13552  1159  13553 0
-13550  13551 -13552  1159  13554 0
-13550  13551 -13552  1159 -13555 0

c  -2-1 --> break 
c    ( b^{19, 61}_2 ∧  b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧ -p_1159) -> break
c  in CNF:
c    -b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨  b^{19, 61}_0 ∨  p_1159 ∨ break
c  in DIMACS:
-13550 -13551  13552  1159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{19, 61}_2 ∧ -b^{19, 61}_1 ∧ -b^{19, 61}_0 ∧ true) 
c  in CNF:
c    -b^{19, 61}_2 ∨  b^{19, 61}_1 ∨  b^{19, 61}_0 ∨ false 
c  in DIMACS:
-13550  13551  13552  0

c  3 does not represent an automaton state.
c    -(-b^{19, 61}_2 ∧  b^{19, 61}_1 ∧  b^{19, 61}_0 ∧ true) 
c  in CNF:
c     b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ false 
c  in DIMACS:
 13550 -13551 -13552  0
c  -3 does not represent an automaton state.
c    -( b^{19, 61}_2 ∧  b^{19, 61}_1 ∧  b^{19, 61}_0 ∧ true) 
c  in CNF:
c    -b^{19, 61}_2 ∨ -b^{19, 61}_1 ∨ -b^{19, 61}_0 ∨ false 
c  in DIMACS:
-13550 -13551 -13552  0

c INIT for k = 20
c    -b^{20, 1}_2
c    -b^{20, 1}_1
c    -b^{20, 1}_0
c  in DIMACS:
-13556 0
-13557 0
-13558 0

c Transitions for k = 20
c i = 1
c  -2+1 --> -1
c    ( b^{20, 1}_2 ∧  b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧  p_20) -> ( b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0)
c  in CNF:
c    -b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨  b^{20, 2}_2
c    -b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_1
c    -b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨  b^{20, 2}_0
c  in DIMACS:
-13556 -13557  13558 -20  13559 0
-13556 -13557  13558 -20 -13560 0
-13556 -13557  13558 -20  13561 0

c  -1+1 --> 0
c    ( b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧  b^{20, 1}_0 ∧  p_20) -> (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧ -b^{20, 2}_0)
c  in CNF:
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_2
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_1
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_0
c  in DIMACS:
-13556  13557 -13558 -20 -13559 0
-13556  13557 -13558 -20 -13560 0
-13556  13557 -13558 -20 -13561 0

c  0+1 --> 1
c    (-b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧  p_20) -> (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0)
c  in CNF:
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_2
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_1
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨  b^{20, 2}_0
c  in DIMACS:
 13556  13557  13558 -20 -13559 0
 13556  13557  13558 -20 -13560 0
 13556  13557  13558 -20  13561 0

c  1+1 --> 2
c    (-b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧  b^{20, 1}_0 ∧  p_20) -> (-b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0)
c  in CNF:
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_2
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨  b^{20, 2}_1
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ -p_20 ∨ -b^{20, 2}_0
c  in DIMACS:
 13556  13557 -13558 -20 -13559 0
 13556  13557 -13558 -20  13560 0
 13556  13557 -13558 -20 -13561 0

c  2+1 --> break 
c    (-b^{20, 1}_2 ∧  b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧  p_20) -> break
c  in CNF:
c     b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ -p_20 ∨ break
c  in DIMACS:
 13556 -13557  13558 -20 1162 0


c  2-1 --> 1
c    (-b^{20, 1}_2 ∧  b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧ -p_20) -> (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0)
c  in CNF:
c     b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_2
c     b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_1
c     b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨  b^{20, 2}_0
c  in DIMACS:
 13556 -13557  13558  20 -13559 0
 13556 -13557  13558  20 -13560 0
 13556 -13557  13558  20  13561 0

c  1-1 --> 0
c    (-b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧  b^{20, 1}_0 ∧ -p_20) -> (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧ -b^{20, 2}_0)
c  in CNF:
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_2
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_1
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_0
c  in DIMACS:
 13556  13557 -13558  20 -13559 0
 13556  13557 -13558  20 -13560 0
 13556  13557 -13558  20 -13561 0

c  0-1 --> -1
c    (-b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧ -p_20) -> ( b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0)
c  in CNF:
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨  b^{20, 2}_2
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_1
c     b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨  b^{20, 2}_0
c  in DIMACS:
 13556  13557  13558  20  13559 0
 13556  13557  13558  20 -13560 0
 13556  13557  13558  20  13561 0

c  -1-1 --> -2
c    ( b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧  b^{20, 1}_0 ∧ -p_20) -> ( b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0)
c  in CNF:
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨  b^{20, 2}_2
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨  b^{20, 2}_1
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨  p_20 ∨ -b^{20, 2}_0
c  in DIMACS:
-13556  13557 -13558  20  13559 0
-13556  13557 -13558  20  13560 0
-13556  13557 -13558  20 -13561 0

c  -2-1 --> break 
c    ( b^{20, 1}_2 ∧  b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧ -p_20) -> break
c  in CNF:
c    -b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨  b^{20, 1}_0 ∨  p_20 ∨ break
c  in DIMACS:
-13556 -13557  13558  20 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 1}_2 ∧ -b^{20, 1}_1 ∧ -b^{20, 1}_0 ∧ true) 
c  in CNF:
c    -b^{20, 1}_2 ∨  b^{20, 1}_1 ∨  b^{20, 1}_0 ∨ false 
c  in DIMACS:
-13556  13557  13558  0

c  3 does not represent an automaton state.
c    -(-b^{20, 1}_2 ∧  b^{20, 1}_1 ∧  b^{20, 1}_0 ∧ true) 
c  in CNF:
c     b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ false 
c  in DIMACS:
 13556 -13557 -13558  0
c  -3 does not represent an automaton state.
c    -( b^{20, 1}_2 ∧  b^{20, 1}_1 ∧  b^{20, 1}_0 ∧ true) 
c  in CNF:
c    -b^{20, 1}_2 ∨ -b^{20, 1}_1 ∨ -b^{20, 1}_0 ∨ false 
c  in DIMACS:
-13556 -13557 -13558  0

c i = 2
c  -2+1 --> -1
c    ( b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧  p_40) -> ( b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0)
c  in CNF:
c    -b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨  b^{20, 3}_2
c    -b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_1
c    -b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨  b^{20, 3}_0
c  in DIMACS:
-13559 -13560  13561 -40  13562 0
-13559 -13560  13561 -40 -13563 0
-13559 -13560  13561 -40  13564 0

c  -1+1 --> 0
c    ( b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0 ∧  p_40) -> (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧ -b^{20, 3}_0)
c  in CNF:
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_2
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_1
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_0
c  in DIMACS:
-13559  13560 -13561 -40 -13562 0
-13559  13560 -13561 -40 -13563 0
-13559  13560 -13561 -40 -13564 0

c  0+1 --> 1
c    (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧  p_40) -> (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0)
c  in CNF:
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_2
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_1
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨  b^{20, 3}_0
c  in DIMACS:
 13559  13560  13561 -40 -13562 0
 13559  13560  13561 -40 -13563 0
 13559  13560  13561 -40  13564 0

c  1+1 --> 2
c    (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0 ∧  p_40) -> (-b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0)
c  in CNF:
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_2
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨  b^{20, 3}_1
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ -p_40 ∨ -b^{20, 3}_0
c  in DIMACS:
 13559  13560 -13561 -40 -13562 0
 13559  13560 -13561 -40  13563 0
 13559  13560 -13561 -40 -13564 0

c  2+1 --> break 
c    (-b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧  p_40) -> break
c  in CNF:
c     b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 13559 -13560  13561 -40 1162 0


c  2-1 --> 1
c    (-b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧ -p_40) -> (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0)
c  in CNF:
c     b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_2
c     b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_1
c     b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨  b^{20, 3}_0
c  in DIMACS:
 13559 -13560  13561  40 -13562 0
 13559 -13560  13561  40 -13563 0
 13559 -13560  13561  40  13564 0

c  1-1 --> 0
c    (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0 ∧ -p_40) -> (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧ -b^{20, 3}_0)
c  in CNF:
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_2
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_1
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_0
c  in DIMACS:
 13559  13560 -13561  40 -13562 0
 13559  13560 -13561  40 -13563 0
 13559  13560 -13561  40 -13564 0

c  0-1 --> -1
c    (-b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧ -p_40) -> ( b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0)
c  in CNF:
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨  b^{20, 3}_2
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_1
c     b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨  b^{20, 3}_0
c  in DIMACS:
 13559  13560  13561  40  13562 0
 13559  13560  13561  40 -13563 0
 13559  13560  13561  40  13564 0

c  -1-1 --> -2
c    ( b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧  b^{20, 2}_0 ∧ -p_40) -> ( b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0)
c  in CNF:
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨  b^{20, 3}_2
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨  b^{20, 3}_1
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨  p_40 ∨ -b^{20, 3}_0
c  in DIMACS:
-13559  13560 -13561  40  13562 0
-13559  13560 -13561  40  13563 0
-13559  13560 -13561  40 -13564 0

c  -2-1 --> break 
c    ( b^{20, 2}_2 ∧  b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨  b^{20, 2}_0 ∨  p_40 ∨ break
c  in DIMACS:
-13559 -13560  13561  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 2}_2 ∧ -b^{20, 2}_1 ∧ -b^{20, 2}_0 ∧ true) 
c  in CNF:
c    -b^{20, 2}_2 ∨  b^{20, 2}_1 ∨  b^{20, 2}_0 ∨ false 
c  in DIMACS:
-13559  13560  13561  0

c  3 does not represent an automaton state.
c    -(-b^{20, 2}_2 ∧  b^{20, 2}_1 ∧  b^{20, 2}_0 ∧ true) 
c  in CNF:
c     b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ false 
c  in DIMACS:
 13559 -13560 -13561  0
c  -3 does not represent an automaton state.
c    -( b^{20, 2}_2 ∧  b^{20, 2}_1 ∧  b^{20, 2}_0 ∧ true) 
c  in CNF:
c    -b^{20, 2}_2 ∨ -b^{20, 2}_1 ∨ -b^{20, 2}_0 ∨ false 
c  in DIMACS:
-13559 -13560 -13561  0

c i = 3
c  -2+1 --> -1
c    ( b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧  p_60) -> ( b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0)
c  in CNF:
c    -b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨  b^{20, 4}_2
c    -b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_1
c    -b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨  b^{20, 4}_0
c  in DIMACS:
-13562 -13563  13564 -60  13565 0
-13562 -13563  13564 -60 -13566 0
-13562 -13563  13564 -60  13567 0

c  -1+1 --> 0
c    ( b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0 ∧  p_60) -> (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧ -b^{20, 4}_0)
c  in CNF:
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_2
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_1
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_0
c  in DIMACS:
-13562  13563 -13564 -60 -13565 0
-13562  13563 -13564 -60 -13566 0
-13562  13563 -13564 -60 -13567 0

c  0+1 --> 1
c    (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧  p_60) -> (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0)
c  in CNF:
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_2
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_1
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨  b^{20, 4}_0
c  in DIMACS:
 13562  13563  13564 -60 -13565 0
 13562  13563  13564 -60 -13566 0
 13562  13563  13564 -60  13567 0

c  1+1 --> 2
c    (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0 ∧  p_60) -> (-b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0)
c  in CNF:
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_2
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨  b^{20, 4}_1
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ -p_60 ∨ -b^{20, 4}_0
c  in DIMACS:
 13562  13563 -13564 -60 -13565 0
 13562  13563 -13564 -60  13566 0
 13562  13563 -13564 -60 -13567 0

c  2+1 --> break 
c    (-b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧  p_60) -> break
c  in CNF:
c     b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 13562 -13563  13564 -60 1162 0


c  2-1 --> 1
c    (-b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧ -p_60) -> (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0)
c  in CNF:
c     b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_2
c     b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_1
c     b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨  b^{20, 4}_0
c  in DIMACS:
 13562 -13563  13564  60 -13565 0
 13562 -13563  13564  60 -13566 0
 13562 -13563  13564  60  13567 0

c  1-1 --> 0
c    (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0 ∧ -p_60) -> (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧ -b^{20, 4}_0)
c  in CNF:
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_2
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_1
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_0
c  in DIMACS:
 13562  13563 -13564  60 -13565 0
 13562  13563 -13564  60 -13566 0
 13562  13563 -13564  60 -13567 0

c  0-1 --> -1
c    (-b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧ -p_60) -> ( b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0)
c  in CNF:
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨  b^{20, 4}_2
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_1
c     b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨  b^{20, 4}_0
c  in DIMACS:
 13562  13563  13564  60  13565 0
 13562  13563  13564  60 -13566 0
 13562  13563  13564  60  13567 0

c  -1-1 --> -2
c    ( b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧  b^{20, 3}_0 ∧ -p_60) -> ( b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0)
c  in CNF:
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨  b^{20, 4}_2
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨  b^{20, 4}_1
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨  p_60 ∨ -b^{20, 4}_0
c  in DIMACS:
-13562  13563 -13564  60  13565 0
-13562  13563 -13564  60  13566 0
-13562  13563 -13564  60 -13567 0

c  -2-1 --> break 
c    ( b^{20, 3}_2 ∧  b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨  b^{20, 3}_0 ∨  p_60 ∨ break
c  in DIMACS:
-13562 -13563  13564  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 3}_2 ∧ -b^{20, 3}_1 ∧ -b^{20, 3}_0 ∧ true) 
c  in CNF:
c    -b^{20, 3}_2 ∨  b^{20, 3}_1 ∨  b^{20, 3}_0 ∨ false 
c  in DIMACS:
-13562  13563  13564  0

c  3 does not represent an automaton state.
c    -(-b^{20, 3}_2 ∧  b^{20, 3}_1 ∧  b^{20, 3}_0 ∧ true) 
c  in CNF:
c     b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ false 
c  in DIMACS:
 13562 -13563 -13564  0
c  -3 does not represent an automaton state.
c    -( b^{20, 3}_2 ∧  b^{20, 3}_1 ∧  b^{20, 3}_0 ∧ true) 
c  in CNF:
c    -b^{20, 3}_2 ∨ -b^{20, 3}_1 ∨ -b^{20, 3}_0 ∨ false 
c  in DIMACS:
-13562 -13563 -13564  0

c i = 4
c  -2+1 --> -1
c    ( b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧  p_80) -> ( b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0)
c  in CNF:
c    -b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨  b^{20, 5}_2
c    -b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_1
c    -b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨  b^{20, 5}_0
c  in DIMACS:
-13565 -13566  13567 -80  13568 0
-13565 -13566  13567 -80 -13569 0
-13565 -13566  13567 -80  13570 0

c  -1+1 --> 0
c    ( b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0 ∧  p_80) -> (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧ -b^{20, 5}_0)
c  in CNF:
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_2
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_1
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_0
c  in DIMACS:
-13565  13566 -13567 -80 -13568 0
-13565  13566 -13567 -80 -13569 0
-13565  13566 -13567 -80 -13570 0

c  0+1 --> 1
c    (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧  p_80) -> (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0)
c  in CNF:
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_2
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_1
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨  b^{20, 5}_0
c  in DIMACS:
 13565  13566  13567 -80 -13568 0
 13565  13566  13567 -80 -13569 0
 13565  13566  13567 -80  13570 0

c  1+1 --> 2
c    (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0 ∧  p_80) -> (-b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0)
c  in CNF:
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_2
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨  b^{20, 5}_1
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ -p_80 ∨ -b^{20, 5}_0
c  in DIMACS:
 13565  13566 -13567 -80 -13568 0
 13565  13566 -13567 -80  13569 0
 13565  13566 -13567 -80 -13570 0

c  2+1 --> break 
c    (-b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧  p_80) -> break
c  in CNF:
c     b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 13565 -13566  13567 -80 1162 0


c  2-1 --> 1
c    (-b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧ -p_80) -> (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0)
c  in CNF:
c     b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_2
c     b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_1
c     b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨  b^{20, 5}_0
c  in DIMACS:
 13565 -13566  13567  80 -13568 0
 13565 -13566  13567  80 -13569 0
 13565 -13566  13567  80  13570 0

c  1-1 --> 0
c    (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0 ∧ -p_80) -> (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧ -b^{20, 5}_0)
c  in CNF:
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_2
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_1
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_0
c  in DIMACS:
 13565  13566 -13567  80 -13568 0
 13565  13566 -13567  80 -13569 0
 13565  13566 -13567  80 -13570 0

c  0-1 --> -1
c    (-b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧ -p_80) -> ( b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0)
c  in CNF:
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨  b^{20, 5}_2
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_1
c     b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨  b^{20, 5}_0
c  in DIMACS:
 13565  13566  13567  80  13568 0
 13565  13566  13567  80 -13569 0
 13565  13566  13567  80  13570 0

c  -1-1 --> -2
c    ( b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧  b^{20, 4}_0 ∧ -p_80) -> ( b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0)
c  in CNF:
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨  b^{20, 5}_2
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨  b^{20, 5}_1
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨  p_80 ∨ -b^{20, 5}_0
c  in DIMACS:
-13565  13566 -13567  80  13568 0
-13565  13566 -13567  80  13569 0
-13565  13566 -13567  80 -13570 0

c  -2-1 --> break 
c    ( b^{20, 4}_2 ∧  b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨  b^{20, 4}_0 ∨  p_80 ∨ break
c  in DIMACS:
-13565 -13566  13567  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 4}_2 ∧ -b^{20, 4}_1 ∧ -b^{20, 4}_0 ∧ true) 
c  in CNF:
c    -b^{20, 4}_2 ∨  b^{20, 4}_1 ∨  b^{20, 4}_0 ∨ false 
c  in DIMACS:
-13565  13566  13567  0

c  3 does not represent an automaton state.
c    -(-b^{20, 4}_2 ∧  b^{20, 4}_1 ∧  b^{20, 4}_0 ∧ true) 
c  in CNF:
c     b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ false 
c  in DIMACS:
 13565 -13566 -13567  0
c  -3 does not represent an automaton state.
c    -( b^{20, 4}_2 ∧  b^{20, 4}_1 ∧  b^{20, 4}_0 ∧ true) 
c  in CNF:
c    -b^{20, 4}_2 ∨ -b^{20, 4}_1 ∨ -b^{20, 4}_0 ∨ false 
c  in DIMACS:
-13565 -13566 -13567  0

c i = 5
c  -2+1 --> -1
c    ( b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧  p_100) -> ( b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0)
c  in CNF:
c    -b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨  b^{20, 6}_2
c    -b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_1
c    -b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨  b^{20, 6}_0
c  in DIMACS:
-13568 -13569  13570 -100  13571 0
-13568 -13569  13570 -100 -13572 0
-13568 -13569  13570 -100  13573 0

c  -1+1 --> 0
c    ( b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0 ∧  p_100) -> (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧ -b^{20, 6}_0)
c  in CNF:
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_2
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_1
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_0
c  in DIMACS:
-13568  13569 -13570 -100 -13571 0
-13568  13569 -13570 -100 -13572 0
-13568  13569 -13570 -100 -13573 0

c  0+1 --> 1
c    (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧  p_100) -> (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0)
c  in CNF:
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_2
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_1
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨  b^{20, 6}_0
c  in DIMACS:
 13568  13569  13570 -100 -13571 0
 13568  13569  13570 -100 -13572 0
 13568  13569  13570 -100  13573 0

c  1+1 --> 2
c    (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0 ∧  p_100) -> (-b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0)
c  in CNF:
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_2
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨  b^{20, 6}_1
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ -p_100 ∨ -b^{20, 6}_0
c  in DIMACS:
 13568  13569 -13570 -100 -13571 0
 13568  13569 -13570 -100  13572 0
 13568  13569 -13570 -100 -13573 0

c  2+1 --> break 
c    (-b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧  p_100) -> break
c  in CNF:
c     b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 13568 -13569  13570 -100 1162 0


c  2-1 --> 1
c    (-b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧ -p_100) -> (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0)
c  in CNF:
c     b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_2
c     b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_1
c     b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨  b^{20, 6}_0
c  in DIMACS:
 13568 -13569  13570  100 -13571 0
 13568 -13569  13570  100 -13572 0
 13568 -13569  13570  100  13573 0

c  1-1 --> 0
c    (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0 ∧ -p_100) -> (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧ -b^{20, 6}_0)
c  in CNF:
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_2
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_1
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_0
c  in DIMACS:
 13568  13569 -13570  100 -13571 0
 13568  13569 -13570  100 -13572 0
 13568  13569 -13570  100 -13573 0

c  0-1 --> -1
c    (-b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧ -p_100) -> ( b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0)
c  in CNF:
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨  b^{20, 6}_2
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_1
c     b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨  b^{20, 6}_0
c  in DIMACS:
 13568  13569  13570  100  13571 0
 13568  13569  13570  100 -13572 0
 13568  13569  13570  100  13573 0

c  -1-1 --> -2
c    ( b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧  b^{20, 5}_0 ∧ -p_100) -> ( b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0)
c  in CNF:
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨  b^{20, 6}_2
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨  b^{20, 6}_1
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨  p_100 ∨ -b^{20, 6}_0
c  in DIMACS:
-13568  13569 -13570  100  13571 0
-13568  13569 -13570  100  13572 0
-13568  13569 -13570  100 -13573 0

c  -2-1 --> break 
c    ( b^{20, 5}_2 ∧  b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨  b^{20, 5}_0 ∨  p_100 ∨ break
c  in DIMACS:
-13568 -13569  13570  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 5}_2 ∧ -b^{20, 5}_1 ∧ -b^{20, 5}_0 ∧ true) 
c  in CNF:
c    -b^{20, 5}_2 ∨  b^{20, 5}_1 ∨  b^{20, 5}_0 ∨ false 
c  in DIMACS:
-13568  13569  13570  0

c  3 does not represent an automaton state.
c    -(-b^{20, 5}_2 ∧  b^{20, 5}_1 ∧  b^{20, 5}_0 ∧ true) 
c  in CNF:
c     b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ false 
c  in DIMACS:
 13568 -13569 -13570  0
c  -3 does not represent an automaton state.
c    -( b^{20, 5}_2 ∧  b^{20, 5}_1 ∧  b^{20, 5}_0 ∧ true) 
c  in CNF:
c    -b^{20, 5}_2 ∨ -b^{20, 5}_1 ∨ -b^{20, 5}_0 ∨ false 
c  in DIMACS:
-13568 -13569 -13570  0

c i = 6
c  -2+1 --> -1
c    ( b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧  p_120) -> ( b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0)
c  in CNF:
c    -b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨  b^{20, 7}_2
c    -b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_1
c    -b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨  b^{20, 7}_0
c  in DIMACS:
-13571 -13572  13573 -120  13574 0
-13571 -13572  13573 -120 -13575 0
-13571 -13572  13573 -120  13576 0

c  -1+1 --> 0
c    ( b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0 ∧  p_120) -> (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧ -b^{20, 7}_0)
c  in CNF:
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_2
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_1
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_0
c  in DIMACS:
-13571  13572 -13573 -120 -13574 0
-13571  13572 -13573 -120 -13575 0
-13571  13572 -13573 -120 -13576 0

c  0+1 --> 1
c    (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧  p_120) -> (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0)
c  in CNF:
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_2
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_1
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨  b^{20, 7}_0
c  in DIMACS:
 13571  13572  13573 -120 -13574 0
 13571  13572  13573 -120 -13575 0
 13571  13572  13573 -120  13576 0

c  1+1 --> 2
c    (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0 ∧  p_120) -> (-b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0)
c  in CNF:
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_2
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨  b^{20, 7}_1
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ -p_120 ∨ -b^{20, 7}_0
c  in DIMACS:
 13571  13572 -13573 -120 -13574 0
 13571  13572 -13573 -120  13575 0
 13571  13572 -13573 -120 -13576 0

c  2+1 --> break 
c    (-b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧  p_120) -> break
c  in CNF:
c     b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 13571 -13572  13573 -120 1162 0


c  2-1 --> 1
c    (-b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧ -p_120) -> (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0)
c  in CNF:
c     b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_2
c     b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_1
c     b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨  b^{20, 7}_0
c  in DIMACS:
 13571 -13572  13573  120 -13574 0
 13571 -13572  13573  120 -13575 0
 13571 -13572  13573  120  13576 0

c  1-1 --> 0
c    (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0 ∧ -p_120) -> (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧ -b^{20, 7}_0)
c  in CNF:
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_2
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_1
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_0
c  in DIMACS:
 13571  13572 -13573  120 -13574 0
 13571  13572 -13573  120 -13575 0
 13571  13572 -13573  120 -13576 0

c  0-1 --> -1
c    (-b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧ -p_120) -> ( b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0)
c  in CNF:
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨  b^{20, 7}_2
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_1
c     b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨  b^{20, 7}_0
c  in DIMACS:
 13571  13572  13573  120  13574 0
 13571  13572  13573  120 -13575 0
 13571  13572  13573  120  13576 0

c  -1-1 --> -2
c    ( b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧  b^{20, 6}_0 ∧ -p_120) -> ( b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0)
c  in CNF:
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨  b^{20, 7}_2
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨  b^{20, 7}_1
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨  p_120 ∨ -b^{20, 7}_0
c  in DIMACS:
-13571  13572 -13573  120  13574 0
-13571  13572 -13573  120  13575 0
-13571  13572 -13573  120 -13576 0

c  -2-1 --> break 
c    ( b^{20, 6}_2 ∧  b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨  b^{20, 6}_0 ∨  p_120 ∨ break
c  in DIMACS:
-13571 -13572  13573  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 6}_2 ∧ -b^{20, 6}_1 ∧ -b^{20, 6}_0 ∧ true) 
c  in CNF:
c    -b^{20, 6}_2 ∨  b^{20, 6}_1 ∨  b^{20, 6}_0 ∨ false 
c  in DIMACS:
-13571  13572  13573  0

c  3 does not represent an automaton state.
c    -(-b^{20, 6}_2 ∧  b^{20, 6}_1 ∧  b^{20, 6}_0 ∧ true) 
c  in CNF:
c     b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ false 
c  in DIMACS:
 13571 -13572 -13573  0
c  -3 does not represent an automaton state.
c    -( b^{20, 6}_2 ∧  b^{20, 6}_1 ∧  b^{20, 6}_0 ∧ true) 
c  in CNF:
c    -b^{20, 6}_2 ∨ -b^{20, 6}_1 ∨ -b^{20, 6}_0 ∨ false 
c  in DIMACS:
-13571 -13572 -13573  0

c i = 7
c  -2+1 --> -1
c    ( b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧  p_140) -> ( b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0)
c  in CNF:
c    -b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨  b^{20, 8}_2
c    -b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_1
c    -b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨  b^{20, 8}_0
c  in DIMACS:
-13574 -13575  13576 -140  13577 0
-13574 -13575  13576 -140 -13578 0
-13574 -13575  13576 -140  13579 0

c  -1+1 --> 0
c    ( b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0 ∧  p_140) -> (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧ -b^{20, 8}_0)
c  in CNF:
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_2
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_1
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_0
c  in DIMACS:
-13574  13575 -13576 -140 -13577 0
-13574  13575 -13576 -140 -13578 0
-13574  13575 -13576 -140 -13579 0

c  0+1 --> 1
c    (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧  p_140) -> (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0)
c  in CNF:
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_2
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_1
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨  b^{20, 8}_0
c  in DIMACS:
 13574  13575  13576 -140 -13577 0
 13574  13575  13576 -140 -13578 0
 13574  13575  13576 -140  13579 0

c  1+1 --> 2
c    (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0 ∧  p_140) -> (-b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0)
c  in CNF:
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_2
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨  b^{20, 8}_1
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ -p_140 ∨ -b^{20, 8}_0
c  in DIMACS:
 13574  13575 -13576 -140 -13577 0
 13574  13575 -13576 -140  13578 0
 13574  13575 -13576 -140 -13579 0

c  2+1 --> break 
c    (-b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧  p_140) -> break
c  in CNF:
c     b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 13574 -13575  13576 -140 1162 0


c  2-1 --> 1
c    (-b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧ -p_140) -> (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0)
c  in CNF:
c     b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_2
c     b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_1
c     b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨  b^{20, 8}_0
c  in DIMACS:
 13574 -13575  13576  140 -13577 0
 13574 -13575  13576  140 -13578 0
 13574 -13575  13576  140  13579 0

c  1-1 --> 0
c    (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0 ∧ -p_140) -> (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧ -b^{20, 8}_0)
c  in CNF:
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_2
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_1
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_0
c  in DIMACS:
 13574  13575 -13576  140 -13577 0
 13574  13575 -13576  140 -13578 0
 13574  13575 -13576  140 -13579 0

c  0-1 --> -1
c    (-b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧ -p_140) -> ( b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0)
c  in CNF:
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨  b^{20, 8}_2
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_1
c     b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨  b^{20, 8}_0
c  in DIMACS:
 13574  13575  13576  140  13577 0
 13574  13575  13576  140 -13578 0
 13574  13575  13576  140  13579 0

c  -1-1 --> -2
c    ( b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧  b^{20, 7}_0 ∧ -p_140) -> ( b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0)
c  in CNF:
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨  b^{20, 8}_2
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨  b^{20, 8}_1
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨  p_140 ∨ -b^{20, 8}_0
c  in DIMACS:
-13574  13575 -13576  140  13577 0
-13574  13575 -13576  140  13578 0
-13574  13575 -13576  140 -13579 0

c  -2-1 --> break 
c    ( b^{20, 7}_2 ∧  b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨  b^{20, 7}_0 ∨  p_140 ∨ break
c  in DIMACS:
-13574 -13575  13576  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 7}_2 ∧ -b^{20, 7}_1 ∧ -b^{20, 7}_0 ∧ true) 
c  in CNF:
c    -b^{20, 7}_2 ∨  b^{20, 7}_1 ∨  b^{20, 7}_0 ∨ false 
c  in DIMACS:
-13574  13575  13576  0

c  3 does not represent an automaton state.
c    -(-b^{20, 7}_2 ∧  b^{20, 7}_1 ∧  b^{20, 7}_0 ∧ true) 
c  in CNF:
c     b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ false 
c  in DIMACS:
 13574 -13575 -13576  0
c  -3 does not represent an automaton state.
c    -( b^{20, 7}_2 ∧  b^{20, 7}_1 ∧  b^{20, 7}_0 ∧ true) 
c  in CNF:
c    -b^{20, 7}_2 ∨ -b^{20, 7}_1 ∨ -b^{20, 7}_0 ∨ false 
c  in DIMACS:
-13574 -13575 -13576  0

c i = 8
c  -2+1 --> -1
c    ( b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧  p_160) -> ( b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0)
c  in CNF:
c    -b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨  b^{20, 9}_2
c    -b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_1
c    -b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨  b^{20, 9}_0
c  in DIMACS:
-13577 -13578  13579 -160  13580 0
-13577 -13578  13579 -160 -13581 0
-13577 -13578  13579 -160  13582 0

c  -1+1 --> 0
c    ( b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0 ∧  p_160) -> (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧ -b^{20, 9}_0)
c  in CNF:
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_2
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_1
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_0
c  in DIMACS:
-13577  13578 -13579 -160 -13580 0
-13577  13578 -13579 -160 -13581 0
-13577  13578 -13579 -160 -13582 0

c  0+1 --> 1
c    (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧  p_160) -> (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0)
c  in CNF:
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_2
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_1
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨  b^{20, 9}_0
c  in DIMACS:
 13577  13578  13579 -160 -13580 0
 13577  13578  13579 -160 -13581 0
 13577  13578  13579 -160  13582 0

c  1+1 --> 2
c    (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0 ∧  p_160) -> (-b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0)
c  in CNF:
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_2
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨  b^{20, 9}_1
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ -p_160 ∨ -b^{20, 9}_0
c  in DIMACS:
 13577  13578 -13579 -160 -13580 0
 13577  13578 -13579 -160  13581 0
 13577  13578 -13579 -160 -13582 0

c  2+1 --> break 
c    (-b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧  p_160) -> break
c  in CNF:
c     b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 13577 -13578  13579 -160 1162 0


c  2-1 --> 1
c    (-b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧ -p_160) -> (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0)
c  in CNF:
c     b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_2
c     b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_1
c     b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨  b^{20, 9}_0
c  in DIMACS:
 13577 -13578  13579  160 -13580 0
 13577 -13578  13579  160 -13581 0
 13577 -13578  13579  160  13582 0

c  1-1 --> 0
c    (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0 ∧ -p_160) -> (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧ -b^{20, 9}_0)
c  in CNF:
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_2
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_1
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_0
c  in DIMACS:
 13577  13578 -13579  160 -13580 0
 13577  13578 -13579  160 -13581 0
 13577  13578 -13579  160 -13582 0

c  0-1 --> -1
c    (-b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧ -p_160) -> ( b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0)
c  in CNF:
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨  b^{20, 9}_2
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_1
c     b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨  b^{20, 9}_0
c  in DIMACS:
 13577  13578  13579  160  13580 0
 13577  13578  13579  160 -13581 0
 13577  13578  13579  160  13582 0

c  -1-1 --> -2
c    ( b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧  b^{20, 8}_0 ∧ -p_160) -> ( b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0)
c  in CNF:
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨  b^{20, 9}_2
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨  b^{20, 9}_1
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨  p_160 ∨ -b^{20, 9}_0
c  in DIMACS:
-13577  13578 -13579  160  13580 0
-13577  13578 -13579  160  13581 0
-13577  13578 -13579  160 -13582 0

c  -2-1 --> break 
c    ( b^{20, 8}_2 ∧  b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨  b^{20, 8}_0 ∨  p_160 ∨ break
c  in DIMACS:
-13577 -13578  13579  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 8}_2 ∧ -b^{20, 8}_1 ∧ -b^{20, 8}_0 ∧ true) 
c  in CNF:
c    -b^{20, 8}_2 ∨  b^{20, 8}_1 ∨  b^{20, 8}_0 ∨ false 
c  in DIMACS:
-13577  13578  13579  0

c  3 does not represent an automaton state.
c    -(-b^{20, 8}_2 ∧  b^{20, 8}_1 ∧  b^{20, 8}_0 ∧ true) 
c  in CNF:
c     b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ false 
c  in DIMACS:
 13577 -13578 -13579  0
c  -3 does not represent an automaton state.
c    -( b^{20, 8}_2 ∧  b^{20, 8}_1 ∧  b^{20, 8}_0 ∧ true) 
c  in CNF:
c    -b^{20, 8}_2 ∨ -b^{20, 8}_1 ∨ -b^{20, 8}_0 ∨ false 
c  in DIMACS:
-13577 -13578 -13579  0

c i = 9
c  -2+1 --> -1
c    ( b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧  p_180) -> ( b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0)
c  in CNF:
c    -b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨  b^{20, 10}_2
c    -b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_1
c    -b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨  b^{20, 10}_0
c  in DIMACS:
-13580 -13581  13582 -180  13583 0
-13580 -13581  13582 -180 -13584 0
-13580 -13581  13582 -180  13585 0

c  -1+1 --> 0
c    ( b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0 ∧  p_180) -> (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧ -b^{20, 10}_0)
c  in CNF:
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_2
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_1
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_0
c  in DIMACS:
-13580  13581 -13582 -180 -13583 0
-13580  13581 -13582 -180 -13584 0
-13580  13581 -13582 -180 -13585 0

c  0+1 --> 1
c    (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧  p_180) -> (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0)
c  in CNF:
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_2
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_1
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨  b^{20, 10}_0
c  in DIMACS:
 13580  13581  13582 -180 -13583 0
 13580  13581  13582 -180 -13584 0
 13580  13581  13582 -180  13585 0

c  1+1 --> 2
c    (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0 ∧  p_180) -> (-b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0)
c  in CNF:
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_2
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨  b^{20, 10}_1
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ -p_180 ∨ -b^{20, 10}_0
c  in DIMACS:
 13580  13581 -13582 -180 -13583 0
 13580  13581 -13582 -180  13584 0
 13580  13581 -13582 -180 -13585 0

c  2+1 --> break 
c    (-b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧  p_180) -> break
c  in CNF:
c     b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 13580 -13581  13582 -180 1162 0


c  2-1 --> 1
c    (-b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧ -p_180) -> (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0)
c  in CNF:
c     b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_2
c     b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_1
c     b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨  b^{20, 10}_0
c  in DIMACS:
 13580 -13581  13582  180 -13583 0
 13580 -13581  13582  180 -13584 0
 13580 -13581  13582  180  13585 0

c  1-1 --> 0
c    (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0 ∧ -p_180) -> (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧ -b^{20, 10}_0)
c  in CNF:
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_2
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_1
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_0
c  in DIMACS:
 13580  13581 -13582  180 -13583 0
 13580  13581 -13582  180 -13584 0
 13580  13581 -13582  180 -13585 0

c  0-1 --> -1
c    (-b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧ -p_180) -> ( b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0)
c  in CNF:
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨  b^{20, 10}_2
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_1
c     b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨  b^{20, 10}_0
c  in DIMACS:
 13580  13581  13582  180  13583 0
 13580  13581  13582  180 -13584 0
 13580  13581  13582  180  13585 0

c  -1-1 --> -2
c    ( b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧  b^{20, 9}_0 ∧ -p_180) -> ( b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0)
c  in CNF:
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨  b^{20, 10}_2
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨  b^{20, 10}_1
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨  p_180 ∨ -b^{20, 10}_0
c  in DIMACS:
-13580  13581 -13582  180  13583 0
-13580  13581 -13582  180  13584 0
-13580  13581 -13582  180 -13585 0

c  -2-1 --> break 
c    ( b^{20, 9}_2 ∧  b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨  b^{20, 9}_0 ∨  p_180 ∨ break
c  in DIMACS:
-13580 -13581  13582  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 9}_2 ∧ -b^{20, 9}_1 ∧ -b^{20, 9}_0 ∧ true) 
c  in CNF:
c    -b^{20, 9}_2 ∨  b^{20, 9}_1 ∨  b^{20, 9}_0 ∨ false 
c  in DIMACS:
-13580  13581  13582  0

c  3 does not represent an automaton state.
c    -(-b^{20, 9}_2 ∧  b^{20, 9}_1 ∧  b^{20, 9}_0 ∧ true) 
c  in CNF:
c     b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ false 
c  in DIMACS:
 13580 -13581 -13582  0
c  -3 does not represent an automaton state.
c    -( b^{20, 9}_2 ∧  b^{20, 9}_1 ∧  b^{20, 9}_0 ∧ true) 
c  in CNF:
c    -b^{20, 9}_2 ∨ -b^{20, 9}_1 ∨ -b^{20, 9}_0 ∨ false 
c  in DIMACS:
-13580 -13581 -13582  0

c i = 10
c  -2+1 --> -1
c    ( b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧  p_200) -> ( b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0)
c  in CNF:
c    -b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨  b^{20, 11}_2
c    -b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_1
c    -b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨  b^{20, 11}_0
c  in DIMACS:
-13583 -13584  13585 -200  13586 0
-13583 -13584  13585 -200 -13587 0
-13583 -13584  13585 -200  13588 0

c  -1+1 --> 0
c    ( b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0 ∧  p_200) -> (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧ -b^{20, 11}_0)
c  in CNF:
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_2
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_1
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_0
c  in DIMACS:
-13583  13584 -13585 -200 -13586 0
-13583  13584 -13585 -200 -13587 0
-13583  13584 -13585 -200 -13588 0

c  0+1 --> 1
c    (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧  p_200) -> (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0)
c  in CNF:
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_2
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_1
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨  b^{20, 11}_0
c  in DIMACS:
 13583  13584  13585 -200 -13586 0
 13583  13584  13585 -200 -13587 0
 13583  13584  13585 -200  13588 0

c  1+1 --> 2
c    (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0 ∧  p_200) -> (-b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0)
c  in CNF:
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_2
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨  b^{20, 11}_1
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ -p_200 ∨ -b^{20, 11}_0
c  in DIMACS:
 13583  13584 -13585 -200 -13586 0
 13583  13584 -13585 -200  13587 0
 13583  13584 -13585 -200 -13588 0

c  2+1 --> break 
c    (-b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧  p_200) -> break
c  in CNF:
c     b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 13583 -13584  13585 -200 1162 0


c  2-1 --> 1
c    (-b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧ -p_200) -> (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0)
c  in CNF:
c     b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_2
c     b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_1
c     b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨  b^{20, 11}_0
c  in DIMACS:
 13583 -13584  13585  200 -13586 0
 13583 -13584  13585  200 -13587 0
 13583 -13584  13585  200  13588 0

c  1-1 --> 0
c    (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0 ∧ -p_200) -> (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧ -b^{20, 11}_0)
c  in CNF:
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_2
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_1
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_0
c  in DIMACS:
 13583  13584 -13585  200 -13586 0
 13583  13584 -13585  200 -13587 0
 13583  13584 -13585  200 -13588 0

c  0-1 --> -1
c    (-b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧ -p_200) -> ( b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0)
c  in CNF:
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨  b^{20, 11}_2
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_1
c     b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨  b^{20, 11}_0
c  in DIMACS:
 13583  13584  13585  200  13586 0
 13583  13584  13585  200 -13587 0
 13583  13584  13585  200  13588 0

c  -1-1 --> -2
c    ( b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧  b^{20, 10}_0 ∧ -p_200) -> ( b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0)
c  in CNF:
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨  b^{20, 11}_2
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨  b^{20, 11}_1
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨  p_200 ∨ -b^{20, 11}_0
c  in DIMACS:
-13583  13584 -13585  200  13586 0
-13583  13584 -13585  200  13587 0
-13583  13584 -13585  200 -13588 0

c  -2-1 --> break 
c    ( b^{20, 10}_2 ∧  b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨  b^{20, 10}_0 ∨  p_200 ∨ break
c  in DIMACS:
-13583 -13584  13585  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 10}_2 ∧ -b^{20, 10}_1 ∧ -b^{20, 10}_0 ∧ true) 
c  in CNF:
c    -b^{20, 10}_2 ∨  b^{20, 10}_1 ∨  b^{20, 10}_0 ∨ false 
c  in DIMACS:
-13583  13584  13585  0

c  3 does not represent an automaton state.
c    -(-b^{20, 10}_2 ∧  b^{20, 10}_1 ∧  b^{20, 10}_0 ∧ true) 
c  in CNF:
c     b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ false 
c  in DIMACS:
 13583 -13584 -13585  0
c  -3 does not represent an automaton state.
c    -( b^{20, 10}_2 ∧  b^{20, 10}_1 ∧  b^{20, 10}_0 ∧ true) 
c  in CNF:
c    -b^{20, 10}_2 ∨ -b^{20, 10}_1 ∨ -b^{20, 10}_0 ∨ false 
c  in DIMACS:
-13583 -13584 -13585  0

c i = 11
c  -2+1 --> -1
c    ( b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧  p_220) -> ( b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0)
c  in CNF:
c    -b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨  b^{20, 12}_2
c    -b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_1
c    -b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨  b^{20, 12}_0
c  in DIMACS:
-13586 -13587  13588 -220  13589 0
-13586 -13587  13588 -220 -13590 0
-13586 -13587  13588 -220  13591 0

c  -1+1 --> 0
c    ( b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0 ∧  p_220) -> (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧ -b^{20, 12}_0)
c  in CNF:
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_2
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_1
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_0
c  in DIMACS:
-13586  13587 -13588 -220 -13589 0
-13586  13587 -13588 -220 -13590 0
-13586  13587 -13588 -220 -13591 0

c  0+1 --> 1
c    (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧  p_220) -> (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0)
c  in CNF:
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_2
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_1
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨  b^{20, 12}_0
c  in DIMACS:
 13586  13587  13588 -220 -13589 0
 13586  13587  13588 -220 -13590 0
 13586  13587  13588 -220  13591 0

c  1+1 --> 2
c    (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0 ∧  p_220) -> (-b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0)
c  in CNF:
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_2
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨  b^{20, 12}_1
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ -p_220 ∨ -b^{20, 12}_0
c  in DIMACS:
 13586  13587 -13588 -220 -13589 0
 13586  13587 -13588 -220  13590 0
 13586  13587 -13588 -220 -13591 0

c  2+1 --> break 
c    (-b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧  p_220) -> break
c  in CNF:
c     b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 13586 -13587  13588 -220 1162 0


c  2-1 --> 1
c    (-b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧ -p_220) -> (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0)
c  in CNF:
c     b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_2
c     b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_1
c     b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨  b^{20, 12}_0
c  in DIMACS:
 13586 -13587  13588  220 -13589 0
 13586 -13587  13588  220 -13590 0
 13586 -13587  13588  220  13591 0

c  1-1 --> 0
c    (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0 ∧ -p_220) -> (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧ -b^{20, 12}_0)
c  in CNF:
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_2
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_1
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_0
c  in DIMACS:
 13586  13587 -13588  220 -13589 0
 13586  13587 -13588  220 -13590 0
 13586  13587 -13588  220 -13591 0

c  0-1 --> -1
c    (-b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧ -p_220) -> ( b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0)
c  in CNF:
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨  b^{20, 12}_2
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_1
c     b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨  b^{20, 12}_0
c  in DIMACS:
 13586  13587  13588  220  13589 0
 13586  13587  13588  220 -13590 0
 13586  13587  13588  220  13591 0

c  -1-1 --> -2
c    ( b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧  b^{20, 11}_0 ∧ -p_220) -> ( b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0)
c  in CNF:
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨  b^{20, 12}_2
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨  b^{20, 12}_1
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨  p_220 ∨ -b^{20, 12}_0
c  in DIMACS:
-13586  13587 -13588  220  13589 0
-13586  13587 -13588  220  13590 0
-13586  13587 -13588  220 -13591 0

c  -2-1 --> break 
c    ( b^{20, 11}_2 ∧  b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨  b^{20, 11}_0 ∨  p_220 ∨ break
c  in DIMACS:
-13586 -13587  13588  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 11}_2 ∧ -b^{20, 11}_1 ∧ -b^{20, 11}_0 ∧ true) 
c  in CNF:
c    -b^{20, 11}_2 ∨  b^{20, 11}_1 ∨  b^{20, 11}_0 ∨ false 
c  in DIMACS:
-13586  13587  13588  0

c  3 does not represent an automaton state.
c    -(-b^{20, 11}_2 ∧  b^{20, 11}_1 ∧  b^{20, 11}_0 ∧ true) 
c  in CNF:
c     b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ false 
c  in DIMACS:
 13586 -13587 -13588  0
c  -3 does not represent an automaton state.
c    -( b^{20, 11}_2 ∧  b^{20, 11}_1 ∧  b^{20, 11}_0 ∧ true) 
c  in CNF:
c    -b^{20, 11}_2 ∨ -b^{20, 11}_1 ∨ -b^{20, 11}_0 ∨ false 
c  in DIMACS:
-13586 -13587 -13588  0

c i = 12
c  -2+1 --> -1
c    ( b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧  p_240) -> ( b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0)
c  in CNF:
c    -b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨  b^{20, 13}_2
c    -b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_1
c    -b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨  b^{20, 13}_0
c  in DIMACS:
-13589 -13590  13591 -240  13592 0
-13589 -13590  13591 -240 -13593 0
-13589 -13590  13591 -240  13594 0

c  -1+1 --> 0
c    ( b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0 ∧  p_240) -> (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧ -b^{20, 13}_0)
c  in CNF:
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_2
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_1
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_0
c  in DIMACS:
-13589  13590 -13591 -240 -13592 0
-13589  13590 -13591 -240 -13593 0
-13589  13590 -13591 -240 -13594 0

c  0+1 --> 1
c    (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧  p_240) -> (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0)
c  in CNF:
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_2
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_1
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨  b^{20, 13}_0
c  in DIMACS:
 13589  13590  13591 -240 -13592 0
 13589  13590  13591 -240 -13593 0
 13589  13590  13591 -240  13594 0

c  1+1 --> 2
c    (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0 ∧  p_240) -> (-b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0)
c  in CNF:
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_2
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨  b^{20, 13}_1
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ -p_240 ∨ -b^{20, 13}_0
c  in DIMACS:
 13589  13590 -13591 -240 -13592 0
 13589  13590 -13591 -240  13593 0
 13589  13590 -13591 -240 -13594 0

c  2+1 --> break 
c    (-b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧  p_240) -> break
c  in CNF:
c     b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 13589 -13590  13591 -240 1162 0


c  2-1 --> 1
c    (-b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧ -p_240) -> (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0)
c  in CNF:
c     b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_2
c     b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_1
c     b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨  b^{20, 13}_0
c  in DIMACS:
 13589 -13590  13591  240 -13592 0
 13589 -13590  13591  240 -13593 0
 13589 -13590  13591  240  13594 0

c  1-1 --> 0
c    (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0 ∧ -p_240) -> (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧ -b^{20, 13}_0)
c  in CNF:
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_2
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_1
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_0
c  in DIMACS:
 13589  13590 -13591  240 -13592 0
 13589  13590 -13591  240 -13593 0
 13589  13590 -13591  240 -13594 0

c  0-1 --> -1
c    (-b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧ -p_240) -> ( b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0)
c  in CNF:
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨  b^{20, 13}_2
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_1
c     b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨  b^{20, 13}_0
c  in DIMACS:
 13589  13590  13591  240  13592 0
 13589  13590  13591  240 -13593 0
 13589  13590  13591  240  13594 0

c  -1-1 --> -2
c    ( b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧  b^{20, 12}_0 ∧ -p_240) -> ( b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0)
c  in CNF:
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨  b^{20, 13}_2
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨  b^{20, 13}_1
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨  p_240 ∨ -b^{20, 13}_0
c  in DIMACS:
-13589  13590 -13591  240  13592 0
-13589  13590 -13591  240  13593 0
-13589  13590 -13591  240 -13594 0

c  -2-1 --> break 
c    ( b^{20, 12}_2 ∧  b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨  b^{20, 12}_0 ∨  p_240 ∨ break
c  in DIMACS:
-13589 -13590  13591  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 12}_2 ∧ -b^{20, 12}_1 ∧ -b^{20, 12}_0 ∧ true) 
c  in CNF:
c    -b^{20, 12}_2 ∨  b^{20, 12}_1 ∨  b^{20, 12}_0 ∨ false 
c  in DIMACS:
-13589  13590  13591  0

c  3 does not represent an automaton state.
c    -(-b^{20, 12}_2 ∧  b^{20, 12}_1 ∧  b^{20, 12}_0 ∧ true) 
c  in CNF:
c     b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ false 
c  in DIMACS:
 13589 -13590 -13591  0
c  -3 does not represent an automaton state.
c    -( b^{20, 12}_2 ∧  b^{20, 12}_1 ∧  b^{20, 12}_0 ∧ true) 
c  in CNF:
c    -b^{20, 12}_2 ∨ -b^{20, 12}_1 ∨ -b^{20, 12}_0 ∨ false 
c  in DIMACS:
-13589 -13590 -13591  0

c i = 13
c  -2+1 --> -1
c    ( b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧  p_260) -> ( b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0)
c  in CNF:
c    -b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨  b^{20, 14}_2
c    -b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_1
c    -b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨  b^{20, 14}_0
c  in DIMACS:
-13592 -13593  13594 -260  13595 0
-13592 -13593  13594 -260 -13596 0
-13592 -13593  13594 -260  13597 0

c  -1+1 --> 0
c    ( b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0 ∧  p_260) -> (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧ -b^{20, 14}_0)
c  in CNF:
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_2
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_1
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_0
c  in DIMACS:
-13592  13593 -13594 -260 -13595 0
-13592  13593 -13594 -260 -13596 0
-13592  13593 -13594 -260 -13597 0

c  0+1 --> 1
c    (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧  p_260) -> (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0)
c  in CNF:
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_2
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_1
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨  b^{20, 14}_0
c  in DIMACS:
 13592  13593  13594 -260 -13595 0
 13592  13593  13594 -260 -13596 0
 13592  13593  13594 -260  13597 0

c  1+1 --> 2
c    (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0 ∧  p_260) -> (-b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0)
c  in CNF:
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_2
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨  b^{20, 14}_1
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ -p_260 ∨ -b^{20, 14}_0
c  in DIMACS:
 13592  13593 -13594 -260 -13595 0
 13592  13593 -13594 -260  13596 0
 13592  13593 -13594 -260 -13597 0

c  2+1 --> break 
c    (-b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧  p_260) -> break
c  in CNF:
c     b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 13592 -13593  13594 -260 1162 0


c  2-1 --> 1
c    (-b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧ -p_260) -> (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0)
c  in CNF:
c     b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_2
c     b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_1
c     b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨  b^{20, 14}_0
c  in DIMACS:
 13592 -13593  13594  260 -13595 0
 13592 -13593  13594  260 -13596 0
 13592 -13593  13594  260  13597 0

c  1-1 --> 0
c    (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0 ∧ -p_260) -> (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧ -b^{20, 14}_0)
c  in CNF:
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_2
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_1
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_0
c  in DIMACS:
 13592  13593 -13594  260 -13595 0
 13592  13593 -13594  260 -13596 0
 13592  13593 -13594  260 -13597 0

c  0-1 --> -1
c    (-b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧ -p_260) -> ( b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0)
c  in CNF:
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨  b^{20, 14}_2
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_1
c     b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨  b^{20, 14}_0
c  in DIMACS:
 13592  13593  13594  260  13595 0
 13592  13593  13594  260 -13596 0
 13592  13593  13594  260  13597 0

c  -1-1 --> -2
c    ( b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧  b^{20, 13}_0 ∧ -p_260) -> ( b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0)
c  in CNF:
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨  b^{20, 14}_2
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨  b^{20, 14}_1
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨  p_260 ∨ -b^{20, 14}_0
c  in DIMACS:
-13592  13593 -13594  260  13595 0
-13592  13593 -13594  260  13596 0
-13592  13593 -13594  260 -13597 0

c  -2-1 --> break 
c    ( b^{20, 13}_2 ∧  b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨  b^{20, 13}_0 ∨  p_260 ∨ break
c  in DIMACS:
-13592 -13593  13594  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 13}_2 ∧ -b^{20, 13}_1 ∧ -b^{20, 13}_0 ∧ true) 
c  in CNF:
c    -b^{20, 13}_2 ∨  b^{20, 13}_1 ∨  b^{20, 13}_0 ∨ false 
c  in DIMACS:
-13592  13593  13594  0

c  3 does not represent an automaton state.
c    -(-b^{20, 13}_2 ∧  b^{20, 13}_1 ∧  b^{20, 13}_0 ∧ true) 
c  in CNF:
c     b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ false 
c  in DIMACS:
 13592 -13593 -13594  0
c  -3 does not represent an automaton state.
c    -( b^{20, 13}_2 ∧  b^{20, 13}_1 ∧  b^{20, 13}_0 ∧ true) 
c  in CNF:
c    -b^{20, 13}_2 ∨ -b^{20, 13}_1 ∨ -b^{20, 13}_0 ∨ false 
c  in DIMACS:
-13592 -13593 -13594  0

c i = 14
c  -2+1 --> -1
c    ( b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧  p_280) -> ( b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0)
c  in CNF:
c    -b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨  b^{20, 15}_2
c    -b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_1
c    -b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨  b^{20, 15}_0
c  in DIMACS:
-13595 -13596  13597 -280  13598 0
-13595 -13596  13597 -280 -13599 0
-13595 -13596  13597 -280  13600 0

c  -1+1 --> 0
c    ( b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0 ∧  p_280) -> (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧ -b^{20, 15}_0)
c  in CNF:
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_2
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_1
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_0
c  in DIMACS:
-13595  13596 -13597 -280 -13598 0
-13595  13596 -13597 -280 -13599 0
-13595  13596 -13597 -280 -13600 0

c  0+1 --> 1
c    (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧  p_280) -> (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0)
c  in CNF:
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_2
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_1
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨  b^{20, 15}_0
c  in DIMACS:
 13595  13596  13597 -280 -13598 0
 13595  13596  13597 -280 -13599 0
 13595  13596  13597 -280  13600 0

c  1+1 --> 2
c    (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0 ∧  p_280) -> (-b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0)
c  in CNF:
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_2
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨  b^{20, 15}_1
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ -p_280 ∨ -b^{20, 15}_0
c  in DIMACS:
 13595  13596 -13597 -280 -13598 0
 13595  13596 -13597 -280  13599 0
 13595  13596 -13597 -280 -13600 0

c  2+1 --> break 
c    (-b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧  p_280) -> break
c  in CNF:
c     b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 13595 -13596  13597 -280 1162 0


c  2-1 --> 1
c    (-b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧ -p_280) -> (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0)
c  in CNF:
c     b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_2
c     b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_1
c     b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨  b^{20, 15}_0
c  in DIMACS:
 13595 -13596  13597  280 -13598 0
 13595 -13596  13597  280 -13599 0
 13595 -13596  13597  280  13600 0

c  1-1 --> 0
c    (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0 ∧ -p_280) -> (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧ -b^{20, 15}_0)
c  in CNF:
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_2
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_1
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_0
c  in DIMACS:
 13595  13596 -13597  280 -13598 0
 13595  13596 -13597  280 -13599 0
 13595  13596 -13597  280 -13600 0

c  0-1 --> -1
c    (-b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧ -p_280) -> ( b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0)
c  in CNF:
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨  b^{20, 15}_2
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_1
c     b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨  b^{20, 15}_0
c  in DIMACS:
 13595  13596  13597  280  13598 0
 13595  13596  13597  280 -13599 0
 13595  13596  13597  280  13600 0

c  -1-1 --> -2
c    ( b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧  b^{20, 14}_0 ∧ -p_280) -> ( b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0)
c  in CNF:
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨  b^{20, 15}_2
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨  b^{20, 15}_1
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨  p_280 ∨ -b^{20, 15}_0
c  in DIMACS:
-13595  13596 -13597  280  13598 0
-13595  13596 -13597  280  13599 0
-13595  13596 -13597  280 -13600 0

c  -2-1 --> break 
c    ( b^{20, 14}_2 ∧  b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨  b^{20, 14}_0 ∨  p_280 ∨ break
c  in DIMACS:
-13595 -13596  13597  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 14}_2 ∧ -b^{20, 14}_1 ∧ -b^{20, 14}_0 ∧ true) 
c  in CNF:
c    -b^{20, 14}_2 ∨  b^{20, 14}_1 ∨  b^{20, 14}_0 ∨ false 
c  in DIMACS:
-13595  13596  13597  0

c  3 does not represent an automaton state.
c    -(-b^{20, 14}_2 ∧  b^{20, 14}_1 ∧  b^{20, 14}_0 ∧ true) 
c  in CNF:
c     b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ false 
c  in DIMACS:
 13595 -13596 -13597  0
c  -3 does not represent an automaton state.
c    -( b^{20, 14}_2 ∧  b^{20, 14}_1 ∧  b^{20, 14}_0 ∧ true) 
c  in CNF:
c    -b^{20, 14}_2 ∨ -b^{20, 14}_1 ∨ -b^{20, 14}_0 ∨ false 
c  in DIMACS:
-13595 -13596 -13597  0

c i = 15
c  -2+1 --> -1
c    ( b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧  p_300) -> ( b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0)
c  in CNF:
c    -b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨  b^{20, 16}_2
c    -b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_1
c    -b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨  b^{20, 16}_0
c  in DIMACS:
-13598 -13599  13600 -300  13601 0
-13598 -13599  13600 -300 -13602 0
-13598 -13599  13600 -300  13603 0

c  -1+1 --> 0
c    ( b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0 ∧  p_300) -> (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧ -b^{20, 16}_0)
c  in CNF:
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_2
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_1
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_0
c  in DIMACS:
-13598  13599 -13600 -300 -13601 0
-13598  13599 -13600 -300 -13602 0
-13598  13599 -13600 -300 -13603 0

c  0+1 --> 1
c    (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧  p_300) -> (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0)
c  in CNF:
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_2
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_1
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨  b^{20, 16}_0
c  in DIMACS:
 13598  13599  13600 -300 -13601 0
 13598  13599  13600 -300 -13602 0
 13598  13599  13600 -300  13603 0

c  1+1 --> 2
c    (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0 ∧  p_300) -> (-b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0)
c  in CNF:
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_2
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨  b^{20, 16}_1
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ -p_300 ∨ -b^{20, 16}_0
c  in DIMACS:
 13598  13599 -13600 -300 -13601 0
 13598  13599 -13600 -300  13602 0
 13598  13599 -13600 -300 -13603 0

c  2+1 --> break 
c    (-b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧  p_300) -> break
c  in CNF:
c     b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 13598 -13599  13600 -300 1162 0


c  2-1 --> 1
c    (-b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧ -p_300) -> (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0)
c  in CNF:
c     b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_2
c     b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_1
c     b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨  b^{20, 16}_0
c  in DIMACS:
 13598 -13599  13600  300 -13601 0
 13598 -13599  13600  300 -13602 0
 13598 -13599  13600  300  13603 0

c  1-1 --> 0
c    (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0 ∧ -p_300) -> (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧ -b^{20, 16}_0)
c  in CNF:
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_2
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_1
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_0
c  in DIMACS:
 13598  13599 -13600  300 -13601 0
 13598  13599 -13600  300 -13602 0
 13598  13599 -13600  300 -13603 0

c  0-1 --> -1
c    (-b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧ -p_300) -> ( b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0)
c  in CNF:
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨  b^{20, 16}_2
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_1
c     b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨  b^{20, 16}_0
c  in DIMACS:
 13598  13599  13600  300  13601 0
 13598  13599  13600  300 -13602 0
 13598  13599  13600  300  13603 0

c  -1-1 --> -2
c    ( b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧  b^{20, 15}_0 ∧ -p_300) -> ( b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0)
c  in CNF:
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨  b^{20, 16}_2
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨  b^{20, 16}_1
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨  p_300 ∨ -b^{20, 16}_0
c  in DIMACS:
-13598  13599 -13600  300  13601 0
-13598  13599 -13600  300  13602 0
-13598  13599 -13600  300 -13603 0

c  -2-1 --> break 
c    ( b^{20, 15}_2 ∧  b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨  b^{20, 15}_0 ∨  p_300 ∨ break
c  in DIMACS:
-13598 -13599  13600  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 15}_2 ∧ -b^{20, 15}_1 ∧ -b^{20, 15}_0 ∧ true) 
c  in CNF:
c    -b^{20, 15}_2 ∨  b^{20, 15}_1 ∨  b^{20, 15}_0 ∨ false 
c  in DIMACS:
-13598  13599  13600  0

c  3 does not represent an automaton state.
c    -(-b^{20, 15}_2 ∧  b^{20, 15}_1 ∧  b^{20, 15}_0 ∧ true) 
c  in CNF:
c     b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ false 
c  in DIMACS:
 13598 -13599 -13600  0
c  -3 does not represent an automaton state.
c    -( b^{20, 15}_2 ∧  b^{20, 15}_1 ∧  b^{20, 15}_0 ∧ true) 
c  in CNF:
c    -b^{20, 15}_2 ∨ -b^{20, 15}_1 ∨ -b^{20, 15}_0 ∨ false 
c  in DIMACS:
-13598 -13599 -13600  0

c i = 16
c  -2+1 --> -1
c    ( b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧  p_320) -> ( b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0)
c  in CNF:
c    -b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨  b^{20, 17}_2
c    -b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_1
c    -b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨  b^{20, 17}_0
c  in DIMACS:
-13601 -13602  13603 -320  13604 0
-13601 -13602  13603 -320 -13605 0
-13601 -13602  13603 -320  13606 0

c  -1+1 --> 0
c    ( b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0 ∧  p_320) -> (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧ -b^{20, 17}_0)
c  in CNF:
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_2
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_1
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_0
c  in DIMACS:
-13601  13602 -13603 -320 -13604 0
-13601  13602 -13603 -320 -13605 0
-13601  13602 -13603 -320 -13606 0

c  0+1 --> 1
c    (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧  p_320) -> (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0)
c  in CNF:
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_2
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_1
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨  b^{20, 17}_0
c  in DIMACS:
 13601  13602  13603 -320 -13604 0
 13601  13602  13603 -320 -13605 0
 13601  13602  13603 -320  13606 0

c  1+1 --> 2
c    (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0 ∧  p_320) -> (-b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0)
c  in CNF:
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_2
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨  b^{20, 17}_1
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ -p_320 ∨ -b^{20, 17}_0
c  in DIMACS:
 13601  13602 -13603 -320 -13604 0
 13601  13602 -13603 -320  13605 0
 13601  13602 -13603 -320 -13606 0

c  2+1 --> break 
c    (-b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧  p_320) -> break
c  in CNF:
c     b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 13601 -13602  13603 -320 1162 0


c  2-1 --> 1
c    (-b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧ -p_320) -> (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0)
c  in CNF:
c     b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_2
c     b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_1
c     b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨  b^{20, 17}_0
c  in DIMACS:
 13601 -13602  13603  320 -13604 0
 13601 -13602  13603  320 -13605 0
 13601 -13602  13603  320  13606 0

c  1-1 --> 0
c    (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0 ∧ -p_320) -> (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧ -b^{20, 17}_0)
c  in CNF:
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_2
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_1
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_0
c  in DIMACS:
 13601  13602 -13603  320 -13604 0
 13601  13602 -13603  320 -13605 0
 13601  13602 -13603  320 -13606 0

c  0-1 --> -1
c    (-b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧ -p_320) -> ( b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0)
c  in CNF:
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨  b^{20, 17}_2
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_1
c     b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨  b^{20, 17}_0
c  in DIMACS:
 13601  13602  13603  320  13604 0
 13601  13602  13603  320 -13605 0
 13601  13602  13603  320  13606 0

c  -1-1 --> -2
c    ( b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧  b^{20, 16}_0 ∧ -p_320) -> ( b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0)
c  in CNF:
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨  b^{20, 17}_2
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨  b^{20, 17}_1
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨  p_320 ∨ -b^{20, 17}_0
c  in DIMACS:
-13601  13602 -13603  320  13604 0
-13601  13602 -13603  320  13605 0
-13601  13602 -13603  320 -13606 0

c  -2-1 --> break 
c    ( b^{20, 16}_2 ∧  b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨  b^{20, 16}_0 ∨  p_320 ∨ break
c  in DIMACS:
-13601 -13602  13603  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 16}_2 ∧ -b^{20, 16}_1 ∧ -b^{20, 16}_0 ∧ true) 
c  in CNF:
c    -b^{20, 16}_2 ∨  b^{20, 16}_1 ∨  b^{20, 16}_0 ∨ false 
c  in DIMACS:
-13601  13602  13603  0

c  3 does not represent an automaton state.
c    -(-b^{20, 16}_2 ∧  b^{20, 16}_1 ∧  b^{20, 16}_0 ∧ true) 
c  in CNF:
c     b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ false 
c  in DIMACS:
 13601 -13602 -13603  0
c  -3 does not represent an automaton state.
c    -( b^{20, 16}_2 ∧  b^{20, 16}_1 ∧  b^{20, 16}_0 ∧ true) 
c  in CNF:
c    -b^{20, 16}_2 ∨ -b^{20, 16}_1 ∨ -b^{20, 16}_0 ∨ false 
c  in DIMACS:
-13601 -13602 -13603  0

c i = 17
c  -2+1 --> -1
c    ( b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧  p_340) -> ( b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0)
c  in CNF:
c    -b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨  b^{20, 18}_2
c    -b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_1
c    -b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨  b^{20, 18}_0
c  in DIMACS:
-13604 -13605  13606 -340  13607 0
-13604 -13605  13606 -340 -13608 0
-13604 -13605  13606 -340  13609 0

c  -1+1 --> 0
c    ( b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0 ∧  p_340) -> (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧ -b^{20, 18}_0)
c  in CNF:
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_2
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_1
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_0
c  in DIMACS:
-13604  13605 -13606 -340 -13607 0
-13604  13605 -13606 -340 -13608 0
-13604  13605 -13606 -340 -13609 0

c  0+1 --> 1
c    (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧  p_340) -> (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0)
c  in CNF:
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_2
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_1
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨  b^{20, 18}_0
c  in DIMACS:
 13604  13605  13606 -340 -13607 0
 13604  13605  13606 -340 -13608 0
 13604  13605  13606 -340  13609 0

c  1+1 --> 2
c    (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0 ∧  p_340) -> (-b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0)
c  in CNF:
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_2
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨  b^{20, 18}_1
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ -p_340 ∨ -b^{20, 18}_0
c  in DIMACS:
 13604  13605 -13606 -340 -13607 0
 13604  13605 -13606 -340  13608 0
 13604  13605 -13606 -340 -13609 0

c  2+1 --> break 
c    (-b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧  p_340) -> break
c  in CNF:
c     b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 13604 -13605  13606 -340 1162 0


c  2-1 --> 1
c    (-b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧ -p_340) -> (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0)
c  in CNF:
c     b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_2
c     b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_1
c     b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨  b^{20, 18}_0
c  in DIMACS:
 13604 -13605  13606  340 -13607 0
 13604 -13605  13606  340 -13608 0
 13604 -13605  13606  340  13609 0

c  1-1 --> 0
c    (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0 ∧ -p_340) -> (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧ -b^{20, 18}_0)
c  in CNF:
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_2
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_1
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_0
c  in DIMACS:
 13604  13605 -13606  340 -13607 0
 13604  13605 -13606  340 -13608 0
 13604  13605 -13606  340 -13609 0

c  0-1 --> -1
c    (-b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧ -p_340) -> ( b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0)
c  in CNF:
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨  b^{20, 18}_2
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_1
c     b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨  b^{20, 18}_0
c  in DIMACS:
 13604  13605  13606  340  13607 0
 13604  13605  13606  340 -13608 0
 13604  13605  13606  340  13609 0

c  -1-1 --> -2
c    ( b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧  b^{20, 17}_0 ∧ -p_340) -> ( b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0)
c  in CNF:
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨  b^{20, 18}_2
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨  b^{20, 18}_1
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨  p_340 ∨ -b^{20, 18}_0
c  in DIMACS:
-13604  13605 -13606  340  13607 0
-13604  13605 -13606  340  13608 0
-13604  13605 -13606  340 -13609 0

c  -2-1 --> break 
c    ( b^{20, 17}_2 ∧  b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨  b^{20, 17}_0 ∨  p_340 ∨ break
c  in DIMACS:
-13604 -13605  13606  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 17}_2 ∧ -b^{20, 17}_1 ∧ -b^{20, 17}_0 ∧ true) 
c  in CNF:
c    -b^{20, 17}_2 ∨  b^{20, 17}_1 ∨  b^{20, 17}_0 ∨ false 
c  in DIMACS:
-13604  13605  13606  0

c  3 does not represent an automaton state.
c    -(-b^{20, 17}_2 ∧  b^{20, 17}_1 ∧  b^{20, 17}_0 ∧ true) 
c  in CNF:
c     b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ false 
c  in DIMACS:
 13604 -13605 -13606  0
c  -3 does not represent an automaton state.
c    -( b^{20, 17}_2 ∧  b^{20, 17}_1 ∧  b^{20, 17}_0 ∧ true) 
c  in CNF:
c    -b^{20, 17}_2 ∨ -b^{20, 17}_1 ∨ -b^{20, 17}_0 ∨ false 
c  in DIMACS:
-13604 -13605 -13606  0

c i = 18
c  -2+1 --> -1
c    ( b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧  p_360) -> ( b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0)
c  in CNF:
c    -b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨  b^{20, 19}_2
c    -b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_1
c    -b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨  b^{20, 19}_0
c  in DIMACS:
-13607 -13608  13609 -360  13610 0
-13607 -13608  13609 -360 -13611 0
-13607 -13608  13609 -360  13612 0

c  -1+1 --> 0
c    ( b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0 ∧  p_360) -> (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧ -b^{20, 19}_0)
c  in CNF:
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_2
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_1
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_0
c  in DIMACS:
-13607  13608 -13609 -360 -13610 0
-13607  13608 -13609 -360 -13611 0
-13607  13608 -13609 -360 -13612 0

c  0+1 --> 1
c    (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧  p_360) -> (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0)
c  in CNF:
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_2
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_1
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨  b^{20, 19}_0
c  in DIMACS:
 13607  13608  13609 -360 -13610 0
 13607  13608  13609 -360 -13611 0
 13607  13608  13609 -360  13612 0

c  1+1 --> 2
c    (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0 ∧  p_360) -> (-b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0)
c  in CNF:
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_2
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨  b^{20, 19}_1
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ -p_360 ∨ -b^{20, 19}_0
c  in DIMACS:
 13607  13608 -13609 -360 -13610 0
 13607  13608 -13609 -360  13611 0
 13607  13608 -13609 -360 -13612 0

c  2+1 --> break 
c    (-b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧  p_360) -> break
c  in CNF:
c     b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 13607 -13608  13609 -360 1162 0


c  2-1 --> 1
c    (-b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧ -p_360) -> (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0)
c  in CNF:
c     b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_2
c     b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_1
c     b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨  b^{20, 19}_0
c  in DIMACS:
 13607 -13608  13609  360 -13610 0
 13607 -13608  13609  360 -13611 0
 13607 -13608  13609  360  13612 0

c  1-1 --> 0
c    (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0 ∧ -p_360) -> (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧ -b^{20, 19}_0)
c  in CNF:
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_2
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_1
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_0
c  in DIMACS:
 13607  13608 -13609  360 -13610 0
 13607  13608 -13609  360 -13611 0
 13607  13608 -13609  360 -13612 0

c  0-1 --> -1
c    (-b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧ -p_360) -> ( b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0)
c  in CNF:
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨  b^{20, 19}_2
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_1
c     b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨  b^{20, 19}_0
c  in DIMACS:
 13607  13608  13609  360  13610 0
 13607  13608  13609  360 -13611 0
 13607  13608  13609  360  13612 0

c  -1-1 --> -2
c    ( b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧  b^{20, 18}_0 ∧ -p_360) -> ( b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0)
c  in CNF:
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨  b^{20, 19}_2
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨  b^{20, 19}_1
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨  p_360 ∨ -b^{20, 19}_0
c  in DIMACS:
-13607  13608 -13609  360  13610 0
-13607  13608 -13609  360  13611 0
-13607  13608 -13609  360 -13612 0

c  -2-1 --> break 
c    ( b^{20, 18}_2 ∧  b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨  b^{20, 18}_0 ∨  p_360 ∨ break
c  in DIMACS:
-13607 -13608  13609  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 18}_2 ∧ -b^{20, 18}_1 ∧ -b^{20, 18}_0 ∧ true) 
c  in CNF:
c    -b^{20, 18}_2 ∨  b^{20, 18}_1 ∨  b^{20, 18}_0 ∨ false 
c  in DIMACS:
-13607  13608  13609  0

c  3 does not represent an automaton state.
c    -(-b^{20, 18}_2 ∧  b^{20, 18}_1 ∧  b^{20, 18}_0 ∧ true) 
c  in CNF:
c     b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ false 
c  in DIMACS:
 13607 -13608 -13609  0
c  -3 does not represent an automaton state.
c    -( b^{20, 18}_2 ∧  b^{20, 18}_1 ∧  b^{20, 18}_0 ∧ true) 
c  in CNF:
c    -b^{20, 18}_2 ∨ -b^{20, 18}_1 ∨ -b^{20, 18}_0 ∨ false 
c  in DIMACS:
-13607 -13608 -13609  0

c i = 19
c  -2+1 --> -1
c    ( b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧  p_380) -> ( b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0)
c  in CNF:
c    -b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨  b^{20, 20}_2
c    -b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_1
c    -b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨  b^{20, 20}_0
c  in DIMACS:
-13610 -13611  13612 -380  13613 0
-13610 -13611  13612 -380 -13614 0
-13610 -13611  13612 -380  13615 0

c  -1+1 --> 0
c    ( b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0 ∧  p_380) -> (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧ -b^{20, 20}_0)
c  in CNF:
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_2
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_1
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_0
c  in DIMACS:
-13610  13611 -13612 -380 -13613 0
-13610  13611 -13612 -380 -13614 0
-13610  13611 -13612 -380 -13615 0

c  0+1 --> 1
c    (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧  p_380) -> (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0)
c  in CNF:
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_2
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_1
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨  b^{20, 20}_0
c  in DIMACS:
 13610  13611  13612 -380 -13613 0
 13610  13611  13612 -380 -13614 0
 13610  13611  13612 -380  13615 0

c  1+1 --> 2
c    (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0 ∧  p_380) -> (-b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0)
c  in CNF:
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_2
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨  b^{20, 20}_1
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ -p_380 ∨ -b^{20, 20}_0
c  in DIMACS:
 13610  13611 -13612 -380 -13613 0
 13610  13611 -13612 -380  13614 0
 13610  13611 -13612 -380 -13615 0

c  2+1 --> break 
c    (-b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧  p_380) -> break
c  in CNF:
c     b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 13610 -13611  13612 -380 1162 0


c  2-1 --> 1
c    (-b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧ -p_380) -> (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0)
c  in CNF:
c     b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_2
c     b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_1
c     b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨  b^{20, 20}_0
c  in DIMACS:
 13610 -13611  13612  380 -13613 0
 13610 -13611  13612  380 -13614 0
 13610 -13611  13612  380  13615 0

c  1-1 --> 0
c    (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0 ∧ -p_380) -> (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧ -b^{20, 20}_0)
c  in CNF:
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_2
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_1
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_0
c  in DIMACS:
 13610  13611 -13612  380 -13613 0
 13610  13611 -13612  380 -13614 0
 13610  13611 -13612  380 -13615 0

c  0-1 --> -1
c    (-b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧ -p_380) -> ( b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0)
c  in CNF:
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨  b^{20, 20}_2
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_1
c     b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨  b^{20, 20}_0
c  in DIMACS:
 13610  13611  13612  380  13613 0
 13610  13611  13612  380 -13614 0
 13610  13611  13612  380  13615 0

c  -1-1 --> -2
c    ( b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧  b^{20, 19}_0 ∧ -p_380) -> ( b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0)
c  in CNF:
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨  b^{20, 20}_2
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨  b^{20, 20}_1
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨  p_380 ∨ -b^{20, 20}_0
c  in DIMACS:
-13610  13611 -13612  380  13613 0
-13610  13611 -13612  380  13614 0
-13610  13611 -13612  380 -13615 0

c  -2-1 --> break 
c    ( b^{20, 19}_2 ∧  b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨  b^{20, 19}_0 ∨  p_380 ∨ break
c  in DIMACS:
-13610 -13611  13612  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 19}_2 ∧ -b^{20, 19}_1 ∧ -b^{20, 19}_0 ∧ true) 
c  in CNF:
c    -b^{20, 19}_2 ∨  b^{20, 19}_1 ∨  b^{20, 19}_0 ∨ false 
c  in DIMACS:
-13610  13611  13612  0

c  3 does not represent an automaton state.
c    -(-b^{20, 19}_2 ∧  b^{20, 19}_1 ∧  b^{20, 19}_0 ∧ true) 
c  in CNF:
c     b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ false 
c  in DIMACS:
 13610 -13611 -13612  0
c  -3 does not represent an automaton state.
c    -( b^{20, 19}_2 ∧  b^{20, 19}_1 ∧  b^{20, 19}_0 ∧ true) 
c  in CNF:
c    -b^{20, 19}_2 ∨ -b^{20, 19}_1 ∨ -b^{20, 19}_0 ∨ false 
c  in DIMACS:
-13610 -13611 -13612  0

c i = 20
c  -2+1 --> -1
c    ( b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧  p_400) -> ( b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0)
c  in CNF:
c    -b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨  b^{20, 21}_2
c    -b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_1
c    -b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨  b^{20, 21}_0
c  in DIMACS:
-13613 -13614  13615 -400  13616 0
-13613 -13614  13615 -400 -13617 0
-13613 -13614  13615 -400  13618 0

c  -1+1 --> 0
c    ( b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0 ∧  p_400) -> (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧ -b^{20, 21}_0)
c  in CNF:
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_2
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_1
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_0
c  in DIMACS:
-13613  13614 -13615 -400 -13616 0
-13613  13614 -13615 -400 -13617 0
-13613  13614 -13615 -400 -13618 0

c  0+1 --> 1
c    (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧  p_400) -> (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0)
c  in CNF:
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_2
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_1
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨  b^{20, 21}_0
c  in DIMACS:
 13613  13614  13615 -400 -13616 0
 13613  13614  13615 -400 -13617 0
 13613  13614  13615 -400  13618 0

c  1+1 --> 2
c    (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0 ∧  p_400) -> (-b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0)
c  in CNF:
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_2
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨  b^{20, 21}_1
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ -p_400 ∨ -b^{20, 21}_0
c  in DIMACS:
 13613  13614 -13615 -400 -13616 0
 13613  13614 -13615 -400  13617 0
 13613  13614 -13615 -400 -13618 0

c  2+1 --> break 
c    (-b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧  p_400) -> break
c  in CNF:
c     b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 13613 -13614  13615 -400 1162 0


c  2-1 --> 1
c    (-b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧ -p_400) -> (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0)
c  in CNF:
c     b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_2
c     b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_1
c     b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨  b^{20, 21}_0
c  in DIMACS:
 13613 -13614  13615  400 -13616 0
 13613 -13614  13615  400 -13617 0
 13613 -13614  13615  400  13618 0

c  1-1 --> 0
c    (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0 ∧ -p_400) -> (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧ -b^{20, 21}_0)
c  in CNF:
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_2
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_1
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_0
c  in DIMACS:
 13613  13614 -13615  400 -13616 0
 13613  13614 -13615  400 -13617 0
 13613  13614 -13615  400 -13618 0

c  0-1 --> -1
c    (-b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧ -p_400) -> ( b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0)
c  in CNF:
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨  b^{20, 21}_2
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_1
c     b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨  b^{20, 21}_0
c  in DIMACS:
 13613  13614  13615  400  13616 0
 13613  13614  13615  400 -13617 0
 13613  13614  13615  400  13618 0

c  -1-1 --> -2
c    ( b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧  b^{20, 20}_0 ∧ -p_400) -> ( b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0)
c  in CNF:
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨  b^{20, 21}_2
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨  b^{20, 21}_1
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨  p_400 ∨ -b^{20, 21}_0
c  in DIMACS:
-13613  13614 -13615  400  13616 0
-13613  13614 -13615  400  13617 0
-13613  13614 -13615  400 -13618 0

c  -2-1 --> break 
c    ( b^{20, 20}_2 ∧  b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨  b^{20, 20}_0 ∨  p_400 ∨ break
c  in DIMACS:
-13613 -13614  13615  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 20}_2 ∧ -b^{20, 20}_1 ∧ -b^{20, 20}_0 ∧ true) 
c  in CNF:
c    -b^{20, 20}_2 ∨  b^{20, 20}_1 ∨  b^{20, 20}_0 ∨ false 
c  in DIMACS:
-13613  13614  13615  0

c  3 does not represent an automaton state.
c    -(-b^{20, 20}_2 ∧  b^{20, 20}_1 ∧  b^{20, 20}_0 ∧ true) 
c  in CNF:
c     b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ false 
c  in DIMACS:
 13613 -13614 -13615  0
c  -3 does not represent an automaton state.
c    -( b^{20, 20}_2 ∧  b^{20, 20}_1 ∧  b^{20, 20}_0 ∧ true) 
c  in CNF:
c    -b^{20, 20}_2 ∨ -b^{20, 20}_1 ∨ -b^{20, 20}_0 ∨ false 
c  in DIMACS:
-13613 -13614 -13615  0

c i = 21
c  -2+1 --> -1
c    ( b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧  p_420) -> ( b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0)
c  in CNF:
c    -b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨  b^{20, 22}_2
c    -b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_1
c    -b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨  b^{20, 22}_0
c  in DIMACS:
-13616 -13617  13618 -420  13619 0
-13616 -13617  13618 -420 -13620 0
-13616 -13617  13618 -420  13621 0

c  -1+1 --> 0
c    ( b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0 ∧  p_420) -> (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧ -b^{20, 22}_0)
c  in CNF:
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_2
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_1
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_0
c  in DIMACS:
-13616  13617 -13618 -420 -13619 0
-13616  13617 -13618 -420 -13620 0
-13616  13617 -13618 -420 -13621 0

c  0+1 --> 1
c    (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧  p_420) -> (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0)
c  in CNF:
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_2
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_1
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨  b^{20, 22}_0
c  in DIMACS:
 13616  13617  13618 -420 -13619 0
 13616  13617  13618 -420 -13620 0
 13616  13617  13618 -420  13621 0

c  1+1 --> 2
c    (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0 ∧  p_420) -> (-b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0)
c  in CNF:
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_2
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨  b^{20, 22}_1
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ -p_420 ∨ -b^{20, 22}_0
c  in DIMACS:
 13616  13617 -13618 -420 -13619 0
 13616  13617 -13618 -420  13620 0
 13616  13617 -13618 -420 -13621 0

c  2+1 --> break 
c    (-b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧  p_420) -> break
c  in CNF:
c     b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 13616 -13617  13618 -420 1162 0


c  2-1 --> 1
c    (-b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧ -p_420) -> (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0)
c  in CNF:
c     b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_2
c     b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_1
c     b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨  b^{20, 22}_0
c  in DIMACS:
 13616 -13617  13618  420 -13619 0
 13616 -13617  13618  420 -13620 0
 13616 -13617  13618  420  13621 0

c  1-1 --> 0
c    (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0 ∧ -p_420) -> (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧ -b^{20, 22}_0)
c  in CNF:
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_2
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_1
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_0
c  in DIMACS:
 13616  13617 -13618  420 -13619 0
 13616  13617 -13618  420 -13620 0
 13616  13617 -13618  420 -13621 0

c  0-1 --> -1
c    (-b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧ -p_420) -> ( b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0)
c  in CNF:
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨  b^{20, 22}_2
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_1
c     b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨  b^{20, 22}_0
c  in DIMACS:
 13616  13617  13618  420  13619 0
 13616  13617  13618  420 -13620 0
 13616  13617  13618  420  13621 0

c  -1-1 --> -2
c    ( b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧  b^{20, 21}_0 ∧ -p_420) -> ( b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0)
c  in CNF:
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨  b^{20, 22}_2
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨  b^{20, 22}_1
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨  p_420 ∨ -b^{20, 22}_0
c  in DIMACS:
-13616  13617 -13618  420  13619 0
-13616  13617 -13618  420  13620 0
-13616  13617 -13618  420 -13621 0

c  -2-1 --> break 
c    ( b^{20, 21}_2 ∧  b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨  b^{20, 21}_0 ∨  p_420 ∨ break
c  in DIMACS:
-13616 -13617  13618  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 21}_2 ∧ -b^{20, 21}_1 ∧ -b^{20, 21}_0 ∧ true) 
c  in CNF:
c    -b^{20, 21}_2 ∨  b^{20, 21}_1 ∨  b^{20, 21}_0 ∨ false 
c  in DIMACS:
-13616  13617  13618  0

c  3 does not represent an automaton state.
c    -(-b^{20, 21}_2 ∧  b^{20, 21}_1 ∧  b^{20, 21}_0 ∧ true) 
c  in CNF:
c     b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ false 
c  in DIMACS:
 13616 -13617 -13618  0
c  -3 does not represent an automaton state.
c    -( b^{20, 21}_2 ∧  b^{20, 21}_1 ∧  b^{20, 21}_0 ∧ true) 
c  in CNF:
c    -b^{20, 21}_2 ∨ -b^{20, 21}_1 ∨ -b^{20, 21}_0 ∨ false 
c  in DIMACS:
-13616 -13617 -13618  0

c i = 22
c  -2+1 --> -1
c    ( b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧  p_440) -> ( b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0)
c  in CNF:
c    -b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨  b^{20, 23}_2
c    -b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_1
c    -b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨  b^{20, 23}_0
c  in DIMACS:
-13619 -13620  13621 -440  13622 0
-13619 -13620  13621 -440 -13623 0
-13619 -13620  13621 -440  13624 0

c  -1+1 --> 0
c    ( b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0 ∧  p_440) -> (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧ -b^{20, 23}_0)
c  in CNF:
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_2
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_1
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_0
c  in DIMACS:
-13619  13620 -13621 -440 -13622 0
-13619  13620 -13621 -440 -13623 0
-13619  13620 -13621 -440 -13624 0

c  0+1 --> 1
c    (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧  p_440) -> (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0)
c  in CNF:
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_2
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_1
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨  b^{20, 23}_0
c  in DIMACS:
 13619  13620  13621 -440 -13622 0
 13619  13620  13621 -440 -13623 0
 13619  13620  13621 -440  13624 0

c  1+1 --> 2
c    (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0 ∧  p_440) -> (-b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0)
c  in CNF:
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_2
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨  b^{20, 23}_1
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ -p_440 ∨ -b^{20, 23}_0
c  in DIMACS:
 13619  13620 -13621 -440 -13622 0
 13619  13620 -13621 -440  13623 0
 13619  13620 -13621 -440 -13624 0

c  2+1 --> break 
c    (-b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧  p_440) -> break
c  in CNF:
c     b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 13619 -13620  13621 -440 1162 0


c  2-1 --> 1
c    (-b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧ -p_440) -> (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0)
c  in CNF:
c     b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_2
c     b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_1
c     b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨  b^{20, 23}_0
c  in DIMACS:
 13619 -13620  13621  440 -13622 0
 13619 -13620  13621  440 -13623 0
 13619 -13620  13621  440  13624 0

c  1-1 --> 0
c    (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0 ∧ -p_440) -> (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧ -b^{20, 23}_0)
c  in CNF:
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_2
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_1
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_0
c  in DIMACS:
 13619  13620 -13621  440 -13622 0
 13619  13620 -13621  440 -13623 0
 13619  13620 -13621  440 -13624 0

c  0-1 --> -1
c    (-b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧ -p_440) -> ( b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0)
c  in CNF:
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨  b^{20, 23}_2
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_1
c     b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨  b^{20, 23}_0
c  in DIMACS:
 13619  13620  13621  440  13622 0
 13619  13620  13621  440 -13623 0
 13619  13620  13621  440  13624 0

c  -1-1 --> -2
c    ( b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧  b^{20, 22}_0 ∧ -p_440) -> ( b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0)
c  in CNF:
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨  b^{20, 23}_2
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨  b^{20, 23}_1
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨  p_440 ∨ -b^{20, 23}_0
c  in DIMACS:
-13619  13620 -13621  440  13622 0
-13619  13620 -13621  440  13623 0
-13619  13620 -13621  440 -13624 0

c  -2-1 --> break 
c    ( b^{20, 22}_2 ∧  b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨  b^{20, 22}_0 ∨  p_440 ∨ break
c  in DIMACS:
-13619 -13620  13621  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 22}_2 ∧ -b^{20, 22}_1 ∧ -b^{20, 22}_0 ∧ true) 
c  in CNF:
c    -b^{20, 22}_2 ∨  b^{20, 22}_1 ∨  b^{20, 22}_0 ∨ false 
c  in DIMACS:
-13619  13620  13621  0

c  3 does not represent an automaton state.
c    -(-b^{20, 22}_2 ∧  b^{20, 22}_1 ∧  b^{20, 22}_0 ∧ true) 
c  in CNF:
c     b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ false 
c  in DIMACS:
 13619 -13620 -13621  0
c  -3 does not represent an automaton state.
c    -( b^{20, 22}_2 ∧  b^{20, 22}_1 ∧  b^{20, 22}_0 ∧ true) 
c  in CNF:
c    -b^{20, 22}_2 ∨ -b^{20, 22}_1 ∨ -b^{20, 22}_0 ∨ false 
c  in DIMACS:
-13619 -13620 -13621  0

c i = 23
c  -2+1 --> -1
c    ( b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧  p_460) -> ( b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0)
c  in CNF:
c    -b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨  b^{20, 24}_2
c    -b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_1
c    -b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨  b^{20, 24}_0
c  in DIMACS:
-13622 -13623  13624 -460  13625 0
-13622 -13623  13624 -460 -13626 0
-13622 -13623  13624 -460  13627 0

c  -1+1 --> 0
c    ( b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0 ∧  p_460) -> (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧ -b^{20, 24}_0)
c  in CNF:
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_2
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_1
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_0
c  in DIMACS:
-13622  13623 -13624 -460 -13625 0
-13622  13623 -13624 -460 -13626 0
-13622  13623 -13624 -460 -13627 0

c  0+1 --> 1
c    (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧  p_460) -> (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0)
c  in CNF:
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_2
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_1
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨  b^{20, 24}_0
c  in DIMACS:
 13622  13623  13624 -460 -13625 0
 13622  13623  13624 -460 -13626 0
 13622  13623  13624 -460  13627 0

c  1+1 --> 2
c    (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0 ∧  p_460) -> (-b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0)
c  in CNF:
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_2
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨  b^{20, 24}_1
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ -p_460 ∨ -b^{20, 24}_0
c  in DIMACS:
 13622  13623 -13624 -460 -13625 0
 13622  13623 -13624 -460  13626 0
 13622  13623 -13624 -460 -13627 0

c  2+1 --> break 
c    (-b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧  p_460) -> break
c  in CNF:
c     b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 13622 -13623  13624 -460 1162 0


c  2-1 --> 1
c    (-b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧ -p_460) -> (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0)
c  in CNF:
c     b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_2
c     b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_1
c     b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨  b^{20, 24}_0
c  in DIMACS:
 13622 -13623  13624  460 -13625 0
 13622 -13623  13624  460 -13626 0
 13622 -13623  13624  460  13627 0

c  1-1 --> 0
c    (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0 ∧ -p_460) -> (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧ -b^{20, 24}_0)
c  in CNF:
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_2
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_1
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_0
c  in DIMACS:
 13622  13623 -13624  460 -13625 0
 13622  13623 -13624  460 -13626 0
 13622  13623 -13624  460 -13627 0

c  0-1 --> -1
c    (-b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧ -p_460) -> ( b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0)
c  in CNF:
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨  b^{20, 24}_2
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_1
c     b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨  b^{20, 24}_0
c  in DIMACS:
 13622  13623  13624  460  13625 0
 13622  13623  13624  460 -13626 0
 13622  13623  13624  460  13627 0

c  -1-1 --> -2
c    ( b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧  b^{20, 23}_0 ∧ -p_460) -> ( b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0)
c  in CNF:
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨  b^{20, 24}_2
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨  b^{20, 24}_1
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨  p_460 ∨ -b^{20, 24}_0
c  in DIMACS:
-13622  13623 -13624  460  13625 0
-13622  13623 -13624  460  13626 0
-13622  13623 -13624  460 -13627 0

c  -2-1 --> break 
c    ( b^{20, 23}_2 ∧  b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨  b^{20, 23}_0 ∨  p_460 ∨ break
c  in DIMACS:
-13622 -13623  13624  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 23}_2 ∧ -b^{20, 23}_1 ∧ -b^{20, 23}_0 ∧ true) 
c  in CNF:
c    -b^{20, 23}_2 ∨  b^{20, 23}_1 ∨  b^{20, 23}_0 ∨ false 
c  in DIMACS:
-13622  13623  13624  0

c  3 does not represent an automaton state.
c    -(-b^{20, 23}_2 ∧  b^{20, 23}_1 ∧  b^{20, 23}_0 ∧ true) 
c  in CNF:
c     b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ false 
c  in DIMACS:
 13622 -13623 -13624  0
c  -3 does not represent an automaton state.
c    -( b^{20, 23}_2 ∧  b^{20, 23}_1 ∧  b^{20, 23}_0 ∧ true) 
c  in CNF:
c    -b^{20, 23}_2 ∨ -b^{20, 23}_1 ∨ -b^{20, 23}_0 ∨ false 
c  in DIMACS:
-13622 -13623 -13624  0

c i = 24
c  -2+1 --> -1
c    ( b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧  p_480) -> ( b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0)
c  in CNF:
c    -b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨  b^{20, 25}_2
c    -b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_1
c    -b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨  b^{20, 25}_0
c  in DIMACS:
-13625 -13626  13627 -480  13628 0
-13625 -13626  13627 -480 -13629 0
-13625 -13626  13627 -480  13630 0

c  -1+1 --> 0
c    ( b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0 ∧  p_480) -> (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧ -b^{20, 25}_0)
c  in CNF:
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_2
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_1
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_0
c  in DIMACS:
-13625  13626 -13627 -480 -13628 0
-13625  13626 -13627 -480 -13629 0
-13625  13626 -13627 -480 -13630 0

c  0+1 --> 1
c    (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧  p_480) -> (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0)
c  in CNF:
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_2
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_1
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨  b^{20, 25}_0
c  in DIMACS:
 13625  13626  13627 -480 -13628 0
 13625  13626  13627 -480 -13629 0
 13625  13626  13627 -480  13630 0

c  1+1 --> 2
c    (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0 ∧  p_480) -> (-b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0)
c  in CNF:
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_2
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨  b^{20, 25}_1
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ -p_480 ∨ -b^{20, 25}_0
c  in DIMACS:
 13625  13626 -13627 -480 -13628 0
 13625  13626 -13627 -480  13629 0
 13625  13626 -13627 -480 -13630 0

c  2+1 --> break 
c    (-b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧  p_480) -> break
c  in CNF:
c     b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 13625 -13626  13627 -480 1162 0


c  2-1 --> 1
c    (-b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧ -p_480) -> (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0)
c  in CNF:
c     b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_2
c     b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_1
c     b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨  b^{20, 25}_0
c  in DIMACS:
 13625 -13626  13627  480 -13628 0
 13625 -13626  13627  480 -13629 0
 13625 -13626  13627  480  13630 0

c  1-1 --> 0
c    (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0 ∧ -p_480) -> (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧ -b^{20, 25}_0)
c  in CNF:
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_2
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_1
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_0
c  in DIMACS:
 13625  13626 -13627  480 -13628 0
 13625  13626 -13627  480 -13629 0
 13625  13626 -13627  480 -13630 0

c  0-1 --> -1
c    (-b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧ -p_480) -> ( b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0)
c  in CNF:
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨  b^{20, 25}_2
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_1
c     b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨  b^{20, 25}_0
c  in DIMACS:
 13625  13626  13627  480  13628 0
 13625  13626  13627  480 -13629 0
 13625  13626  13627  480  13630 0

c  -1-1 --> -2
c    ( b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧  b^{20, 24}_0 ∧ -p_480) -> ( b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0)
c  in CNF:
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨  b^{20, 25}_2
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨  b^{20, 25}_1
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨  p_480 ∨ -b^{20, 25}_0
c  in DIMACS:
-13625  13626 -13627  480  13628 0
-13625  13626 -13627  480  13629 0
-13625  13626 -13627  480 -13630 0

c  -2-1 --> break 
c    ( b^{20, 24}_2 ∧  b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨  b^{20, 24}_0 ∨  p_480 ∨ break
c  in DIMACS:
-13625 -13626  13627  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 24}_2 ∧ -b^{20, 24}_1 ∧ -b^{20, 24}_0 ∧ true) 
c  in CNF:
c    -b^{20, 24}_2 ∨  b^{20, 24}_1 ∨  b^{20, 24}_0 ∨ false 
c  in DIMACS:
-13625  13626  13627  0

c  3 does not represent an automaton state.
c    -(-b^{20, 24}_2 ∧  b^{20, 24}_1 ∧  b^{20, 24}_0 ∧ true) 
c  in CNF:
c     b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ false 
c  in DIMACS:
 13625 -13626 -13627  0
c  -3 does not represent an automaton state.
c    -( b^{20, 24}_2 ∧  b^{20, 24}_1 ∧  b^{20, 24}_0 ∧ true) 
c  in CNF:
c    -b^{20, 24}_2 ∨ -b^{20, 24}_1 ∨ -b^{20, 24}_0 ∨ false 
c  in DIMACS:
-13625 -13626 -13627  0

c i = 25
c  -2+1 --> -1
c    ( b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧  p_500) -> ( b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0)
c  in CNF:
c    -b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨  b^{20, 26}_2
c    -b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_1
c    -b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨  b^{20, 26}_0
c  in DIMACS:
-13628 -13629  13630 -500  13631 0
-13628 -13629  13630 -500 -13632 0
-13628 -13629  13630 -500  13633 0

c  -1+1 --> 0
c    ( b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0 ∧  p_500) -> (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧ -b^{20, 26}_0)
c  in CNF:
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_2
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_1
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_0
c  in DIMACS:
-13628  13629 -13630 -500 -13631 0
-13628  13629 -13630 -500 -13632 0
-13628  13629 -13630 -500 -13633 0

c  0+1 --> 1
c    (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧  p_500) -> (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0)
c  in CNF:
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_2
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_1
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨  b^{20, 26}_0
c  in DIMACS:
 13628  13629  13630 -500 -13631 0
 13628  13629  13630 -500 -13632 0
 13628  13629  13630 -500  13633 0

c  1+1 --> 2
c    (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0 ∧  p_500) -> (-b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0)
c  in CNF:
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_2
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨  b^{20, 26}_1
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ -p_500 ∨ -b^{20, 26}_0
c  in DIMACS:
 13628  13629 -13630 -500 -13631 0
 13628  13629 -13630 -500  13632 0
 13628  13629 -13630 -500 -13633 0

c  2+1 --> break 
c    (-b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧  p_500) -> break
c  in CNF:
c     b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 13628 -13629  13630 -500 1162 0


c  2-1 --> 1
c    (-b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧ -p_500) -> (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0)
c  in CNF:
c     b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_2
c     b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_1
c     b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨  b^{20, 26}_0
c  in DIMACS:
 13628 -13629  13630  500 -13631 0
 13628 -13629  13630  500 -13632 0
 13628 -13629  13630  500  13633 0

c  1-1 --> 0
c    (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0 ∧ -p_500) -> (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧ -b^{20, 26}_0)
c  in CNF:
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_2
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_1
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_0
c  in DIMACS:
 13628  13629 -13630  500 -13631 0
 13628  13629 -13630  500 -13632 0
 13628  13629 -13630  500 -13633 0

c  0-1 --> -1
c    (-b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧ -p_500) -> ( b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0)
c  in CNF:
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨  b^{20, 26}_2
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_1
c     b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨  b^{20, 26}_0
c  in DIMACS:
 13628  13629  13630  500  13631 0
 13628  13629  13630  500 -13632 0
 13628  13629  13630  500  13633 0

c  -1-1 --> -2
c    ( b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧  b^{20, 25}_0 ∧ -p_500) -> ( b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0)
c  in CNF:
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨  b^{20, 26}_2
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨  b^{20, 26}_1
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨  p_500 ∨ -b^{20, 26}_0
c  in DIMACS:
-13628  13629 -13630  500  13631 0
-13628  13629 -13630  500  13632 0
-13628  13629 -13630  500 -13633 0

c  -2-1 --> break 
c    ( b^{20, 25}_2 ∧  b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨  b^{20, 25}_0 ∨  p_500 ∨ break
c  in DIMACS:
-13628 -13629  13630  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 25}_2 ∧ -b^{20, 25}_1 ∧ -b^{20, 25}_0 ∧ true) 
c  in CNF:
c    -b^{20, 25}_2 ∨  b^{20, 25}_1 ∨  b^{20, 25}_0 ∨ false 
c  in DIMACS:
-13628  13629  13630  0

c  3 does not represent an automaton state.
c    -(-b^{20, 25}_2 ∧  b^{20, 25}_1 ∧  b^{20, 25}_0 ∧ true) 
c  in CNF:
c     b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ false 
c  in DIMACS:
 13628 -13629 -13630  0
c  -3 does not represent an automaton state.
c    -( b^{20, 25}_2 ∧  b^{20, 25}_1 ∧  b^{20, 25}_0 ∧ true) 
c  in CNF:
c    -b^{20, 25}_2 ∨ -b^{20, 25}_1 ∨ -b^{20, 25}_0 ∨ false 
c  in DIMACS:
-13628 -13629 -13630  0

c i = 26
c  -2+1 --> -1
c    ( b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧  p_520) -> ( b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0)
c  in CNF:
c    -b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨  b^{20, 27}_2
c    -b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_1
c    -b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨  b^{20, 27}_0
c  in DIMACS:
-13631 -13632  13633 -520  13634 0
-13631 -13632  13633 -520 -13635 0
-13631 -13632  13633 -520  13636 0

c  -1+1 --> 0
c    ( b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0 ∧  p_520) -> (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧ -b^{20, 27}_0)
c  in CNF:
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_2
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_1
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_0
c  in DIMACS:
-13631  13632 -13633 -520 -13634 0
-13631  13632 -13633 -520 -13635 0
-13631  13632 -13633 -520 -13636 0

c  0+1 --> 1
c    (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧  p_520) -> (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0)
c  in CNF:
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_2
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_1
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨  b^{20, 27}_0
c  in DIMACS:
 13631  13632  13633 -520 -13634 0
 13631  13632  13633 -520 -13635 0
 13631  13632  13633 -520  13636 0

c  1+1 --> 2
c    (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0 ∧  p_520) -> (-b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0)
c  in CNF:
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_2
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨  b^{20, 27}_1
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ -p_520 ∨ -b^{20, 27}_0
c  in DIMACS:
 13631  13632 -13633 -520 -13634 0
 13631  13632 -13633 -520  13635 0
 13631  13632 -13633 -520 -13636 0

c  2+1 --> break 
c    (-b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧  p_520) -> break
c  in CNF:
c     b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 13631 -13632  13633 -520 1162 0


c  2-1 --> 1
c    (-b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧ -p_520) -> (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0)
c  in CNF:
c     b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_2
c     b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_1
c     b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨  b^{20, 27}_0
c  in DIMACS:
 13631 -13632  13633  520 -13634 0
 13631 -13632  13633  520 -13635 0
 13631 -13632  13633  520  13636 0

c  1-1 --> 0
c    (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0 ∧ -p_520) -> (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧ -b^{20, 27}_0)
c  in CNF:
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_2
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_1
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_0
c  in DIMACS:
 13631  13632 -13633  520 -13634 0
 13631  13632 -13633  520 -13635 0
 13631  13632 -13633  520 -13636 0

c  0-1 --> -1
c    (-b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧ -p_520) -> ( b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0)
c  in CNF:
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨  b^{20, 27}_2
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_1
c     b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨  b^{20, 27}_0
c  in DIMACS:
 13631  13632  13633  520  13634 0
 13631  13632  13633  520 -13635 0
 13631  13632  13633  520  13636 0

c  -1-1 --> -2
c    ( b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧  b^{20, 26}_0 ∧ -p_520) -> ( b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0)
c  in CNF:
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨  b^{20, 27}_2
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨  b^{20, 27}_1
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨  p_520 ∨ -b^{20, 27}_0
c  in DIMACS:
-13631  13632 -13633  520  13634 0
-13631  13632 -13633  520  13635 0
-13631  13632 -13633  520 -13636 0

c  -2-1 --> break 
c    ( b^{20, 26}_2 ∧  b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨  b^{20, 26}_0 ∨  p_520 ∨ break
c  in DIMACS:
-13631 -13632  13633  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 26}_2 ∧ -b^{20, 26}_1 ∧ -b^{20, 26}_0 ∧ true) 
c  in CNF:
c    -b^{20, 26}_2 ∨  b^{20, 26}_1 ∨  b^{20, 26}_0 ∨ false 
c  in DIMACS:
-13631  13632  13633  0

c  3 does not represent an automaton state.
c    -(-b^{20, 26}_2 ∧  b^{20, 26}_1 ∧  b^{20, 26}_0 ∧ true) 
c  in CNF:
c     b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ false 
c  in DIMACS:
 13631 -13632 -13633  0
c  -3 does not represent an automaton state.
c    -( b^{20, 26}_2 ∧  b^{20, 26}_1 ∧  b^{20, 26}_0 ∧ true) 
c  in CNF:
c    -b^{20, 26}_2 ∨ -b^{20, 26}_1 ∨ -b^{20, 26}_0 ∨ false 
c  in DIMACS:
-13631 -13632 -13633  0

c i = 27
c  -2+1 --> -1
c    ( b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧  p_540) -> ( b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0)
c  in CNF:
c    -b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨  b^{20, 28}_2
c    -b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_1
c    -b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨  b^{20, 28}_0
c  in DIMACS:
-13634 -13635  13636 -540  13637 0
-13634 -13635  13636 -540 -13638 0
-13634 -13635  13636 -540  13639 0

c  -1+1 --> 0
c    ( b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0 ∧  p_540) -> (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧ -b^{20, 28}_0)
c  in CNF:
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_2
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_1
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_0
c  in DIMACS:
-13634  13635 -13636 -540 -13637 0
-13634  13635 -13636 -540 -13638 0
-13634  13635 -13636 -540 -13639 0

c  0+1 --> 1
c    (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧  p_540) -> (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0)
c  in CNF:
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_2
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_1
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨  b^{20, 28}_0
c  in DIMACS:
 13634  13635  13636 -540 -13637 0
 13634  13635  13636 -540 -13638 0
 13634  13635  13636 -540  13639 0

c  1+1 --> 2
c    (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0 ∧  p_540) -> (-b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0)
c  in CNF:
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_2
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨  b^{20, 28}_1
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ -p_540 ∨ -b^{20, 28}_0
c  in DIMACS:
 13634  13635 -13636 -540 -13637 0
 13634  13635 -13636 -540  13638 0
 13634  13635 -13636 -540 -13639 0

c  2+1 --> break 
c    (-b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧  p_540) -> break
c  in CNF:
c     b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 13634 -13635  13636 -540 1162 0


c  2-1 --> 1
c    (-b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧ -p_540) -> (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0)
c  in CNF:
c     b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_2
c     b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_1
c     b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨  b^{20, 28}_0
c  in DIMACS:
 13634 -13635  13636  540 -13637 0
 13634 -13635  13636  540 -13638 0
 13634 -13635  13636  540  13639 0

c  1-1 --> 0
c    (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0 ∧ -p_540) -> (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧ -b^{20, 28}_0)
c  in CNF:
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_2
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_1
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_0
c  in DIMACS:
 13634  13635 -13636  540 -13637 0
 13634  13635 -13636  540 -13638 0
 13634  13635 -13636  540 -13639 0

c  0-1 --> -1
c    (-b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧ -p_540) -> ( b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0)
c  in CNF:
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨  b^{20, 28}_2
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_1
c     b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨  b^{20, 28}_0
c  in DIMACS:
 13634  13635  13636  540  13637 0
 13634  13635  13636  540 -13638 0
 13634  13635  13636  540  13639 0

c  -1-1 --> -2
c    ( b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧  b^{20, 27}_0 ∧ -p_540) -> ( b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0)
c  in CNF:
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨  b^{20, 28}_2
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨  b^{20, 28}_1
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨  p_540 ∨ -b^{20, 28}_0
c  in DIMACS:
-13634  13635 -13636  540  13637 0
-13634  13635 -13636  540  13638 0
-13634  13635 -13636  540 -13639 0

c  -2-1 --> break 
c    ( b^{20, 27}_2 ∧  b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨  b^{20, 27}_0 ∨  p_540 ∨ break
c  in DIMACS:
-13634 -13635  13636  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 27}_2 ∧ -b^{20, 27}_1 ∧ -b^{20, 27}_0 ∧ true) 
c  in CNF:
c    -b^{20, 27}_2 ∨  b^{20, 27}_1 ∨  b^{20, 27}_0 ∨ false 
c  in DIMACS:
-13634  13635  13636  0

c  3 does not represent an automaton state.
c    -(-b^{20, 27}_2 ∧  b^{20, 27}_1 ∧  b^{20, 27}_0 ∧ true) 
c  in CNF:
c     b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ false 
c  in DIMACS:
 13634 -13635 -13636  0
c  -3 does not represent an automaton state.
c    -( b^{20, 27}_2 ∧  b^{20, 27}_1 ∧  b^{20, 27}_0 ∧ true) 
c  in CNF:
c    -b^{20, 27}_2 ∨ -b^{20, 27}_1 ∨ -b^{20, 27}_0 ∨ false 
c  in DIMACS:
-13634 -13635 -13636  0

c i = 28
c  -2+1 --> -1
c    ( b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧  p_560) -> ( b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0)
c  in CNF:
c    -b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨  b^{20, 29}_2
c    -b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_1
c    -b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨  b^{20, 29}_0
c  in DIMACS:
-13637 -13638  13639 -560  13640 0
-13637 -13638  13639 -560 -13641 0
-13637 -13638  13639 -560  13642 0

c  -1+1 --> 0
c    ( b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0 ∧  p_560) -> (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧ -b^{20, 29}_0)
c  in CNF:
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_2
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_1
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_0
c  in DIMACS:
-13637  13638 -13639 -560 -13640 0
-13637  13638 -13639 -560 -13641 0
-13637  13638 -13639 -560 -13642 0

c  0+1 --> 1
c    (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧  p_560) -> (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0)
c  in CNF:
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_2
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_1
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨  b^{20, 29}_0
c  in DIMACS:
 13637  13638  13639 -560 -13640 0
 13637  13638  13639 -560 -13641 0
 13637  13638  13639 -560  13642 0

c  1+1 --> 2
c    (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0 ∧  p_560) -> (-b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0)
c  in CNF:
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_2
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨  b^{20, 29}_1
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ -p_560 ∨ -b^{20, 29}_0
c  in DIMACS:
 13637  13638 -13639 -560 -13640 0
 13637  13638 -13639 -560  13641 0
 13637  13638 -13639 -560 -13642 0

c  2+1 --> break 
c    (-b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧  p_560) -> break
c  in CNF:
c     b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 13637 -13638  13639 -560 1162 0


c  2-1 --> 1
c    (-b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧ -p_560) -> (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0)
c  in CNF:
c     b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_2
c     b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_1
c     b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨  b^{20, 29}_0
c  in DIMACS:
 13637 -13638  13639  560 -13640 0
 13637 -13638  13639  560 -13641 0
 13637 -13638  13639  560  13642 0

c  1-1 --> 0
c    (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0 ∧ -p_560) -> (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧ -b^{20, 29}_0)
c  in CNF:
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_2
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_1
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_0
c  in DIMACS:
 13637  13638 -13639  560 -13640 0
 13637  13638 -13639  560 -13641 0
 13637  13638 -13639  560 -13642 0

c  0-1 --> -1
c    (-b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧ -p_560) -> ( b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0)
c  in CNF:
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨  b^{20, 29}_2
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_1
c     b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨  b^{20, 29}_0
c  in DIMACS:
 13637  13638  13639  560  13640 0
 13637  13638  13639  560 -13641 0
 13637  13638  13639  560  13642 0

c  -1-1 --> -2
c    ( b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧  b^{20, 28}_0 ∧ -p_560) -> ( b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0)
c  in CNF:
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨  b^{20, 29}_2
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨  b^{20, 29}_1
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨  p_560 ∨ -b^{20, 29}_0
c  in DIMACS:
-13637  13638 -13639  560  13640 0
-13637  13638 -13639  560  13641 0
-13637  13638 -13639  560 -13642 0

c  -2-1 --> break 
c    ( b^{20, 28}_2 ∧  b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨  b^{20, 28}_0 ∨  p_560 ∨ break
c  in DIMACS:
-13637 -13638  13639  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 28}_2 ∧ -b^{20, 28}_1 ∧ -b^{20, 28}_0 ∧ true) 
c  in CNF:
c    -b^{20, 28}_2 ∨  b^{20, 28}_1 ∨  b^{20, 28}_0 ∨ false 
c  in DIMACS:
-13637  13638  13639  0

c  3 does not represent an automaton state.
c    -(-b^{20, 28}_2 ∧  b^{20, 28}_1 ∧  b^{20, 28}_0 ∧ true) 
c  in CNF:
c     b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ false 
c  in DIMACS:
 13637 -13638 -13639  0
c  -3 does not represent an automaton state.
c    -( b^{20, 28}_2 ∧  b^{20, 28}_1 ∧  b^{20, 28}_0 ∧ true) 
c  in CNF:
c    -b^{20, 28}_2 ∨ -b^{20, 28}_1 ∨ -b^{20, 28}_0 ∨ false 
c  in DIMACS:
-13637 -13638 -13639  0

c i = 29
c  -2+1 --> -1
c    ( b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧  p_580) -> ( b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0)
c  in CNF:
c    -b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨  b^{20, 30}_2
c    -b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_1
c    -b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨  b^{20, 30}_0
c  in DIMACS:
-13640 -13641  13642 -580  13643 0
-13640 -13641  13642 -580 -13644 0
-13640 -13641  13642 -580  13645 0

c  -1+1 --> 0
c    ( b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0 ∧  p_580) -> (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧ -b^{20, 30}_0)
c  in CNF:
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_2
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_1
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_0
c  in DIMACS:
-13640  13641 -13642 -580 -13643 0
-13640  13641 -13642 -580 -13644 0
-13640  13641 -13642 -580 -13645 0

c  0+1 --> 1
c    (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧  p_580) -> (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0)
c  in CNF:
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_2
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_1
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨  b^{20, 30}_0
c  in DIMACS:
 13640  13641  13642 -580 -13643 0
 13640  13641  13642 -580 -13644 0
 13640  13641  13642 -580  13645 0

c  1+1 --> 2
c    (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0 ∧  p_580) -> (-b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0)
c  in CNF:
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_2
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨  b^{20, 30}_1
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ -p_580 ∨ -b^{20, 30}_0
c  in DIMACS:
 13640  13641 -13642 -580 -13643 0
 13640  13641 -13642 -580  13644 0
 13640  13641 -13642 -580 -13645 0

c  2+1 --> break 
c    (-b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧  p_580) -> break
c  in CNF:
c     b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 13640 -13641  13642 -580 1162 0


c  2-1 --> 1
c    (-b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧ -p_580) -> (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0)
c  in CNF:
c     b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_2
c     b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_1
c     b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨  b^{20, 30}_0
c  in DIMACS:
 13640 -13641  13642  580 -13643 0
 13640 -13641  13642  580 -13644 0
 13640 -13641  13642  580  13645 0

c  1-1 --> 0
c    (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0 ∧ -p_580) -> (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧ -b^{20, 30}_0)
c  in CNF:
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_2
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_1
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_0
c  in DIMACS:
 13640  13641 -13642  580 -13643 0
 13640  13641 -13642  580 -13644 0
 13640  13641 -13642  580 -13645 0

c  0-1 --> -1
c    (-b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧ -p_580) -> ( b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0)
c  in CNF:
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨  b^{20, 30}_2
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_1
c     b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨  b^{20, 30}_0
c  in DIMACS:
 13640  13641  13642  580  13643 0
 13640  13641  13642  580 -13644 0
 13640  13641  13642  580  13645 0

c  -1-1 --> -2
c    ( b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧  b^{20, 29}_0 ∧ -p_580) -> ( b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0)
c  in CNF:
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨  b^{20, 30}_2
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨  b^{20, 30}_1
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨  p_580 ∨ -b^{20, 30}_0
c  in DIMACS:
-13640  13641 -13642  580  13643 0
-13640  13641 -13642  580  13644 0
-13640  13641 -13642  580 -13645 0

c  -2-1 --> break 
c    ( b^{20, 29}_2 ∧  b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨  b^{20, 29}_0 ∨  p_580 ∨ break
c  in DIMACS:
-13640 -13641  13642  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 29}_2 ∧ -b^{20, 29}_1 ∧ -b^{20, 29}_0 ∧ true) 
c  in CNF:
c    -b^{20, 29}_2 ∨  b^{20, 29}_1 ∨  b^{20, 29}_0 ∨ false 
c  in DIMACS:
-13640  13641  13642  0

c  3 does not represent an automaton state.
c    -(-b^{20, 29}_2 ∧  b^{20, 29}_1 ∧  b^{20, 29}_0 ∧ true) 
c  in CNF:
c     b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ false 
c  in DIMACS:
 13640 -13641 -13642  0
c  -3 does not represent an automaton state.
c    -( b^{20, 29}_2 ∧  b^{20, 29}_1 ∧  b^{20, 29}_0 ∧ true) 
c  in CNF:
c    -b^{20, 29}_2 ∨ -b^{20, 29}_1 ∨ -b^{20, 29}_0 ∨ false 
c  in DIMACS:
-13640 -13641 -13642  0

c i = 30
c  -2+1 --> -1
c    ( b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧  p_600) -> ( b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0)
c  in CNF:
c    -b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨  b^{20, 31}_2
c    -b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_1
c    -b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨  b^{20, 31}_0
c  in DIMACS:
-13643 -13644  13645 -600  13646 0
-13643 -13644  13645 -600 -13647 0
-13643 -13644  13645 -600  13648 0

c  -1+1 --> 0
c    ( b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0 ∧  p_600) -> (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧ -b^{20, 31}_0)
c  in CNF:
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_2
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_1
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_0
c  in DIMACS:
-13643  13644 -13645 -600 -13646 0
-13643  13644 -13645 -600 -13647 0
-13643  13644 -13645 -600 -13648 0

c  0+1 --> 1
c    (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧  p_600) -> (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0)
c  in CNF:
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_2
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_1
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨  b^{20, 31}_0
c  in DIMACS:
 13643  13644  13645 -600 -13646 0
 13643  13644  13645 -600 -13647 0
 13643  13644  13645 -600  13648 0

c  1+1 --> 2
c    (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0 ∧  p_600) -> (-b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0)
c  in CNF:
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_2
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨  b^{20, 31}_1
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ -p_600 ∨ -b^{20, 31}_0
c  in DIMACS:
 13643  13644 -13645 -600 -13646 0
 13643  13644 -13645 -600  13647 0
 13643  13644 -13645 -600 -13648 0

c  2+1 --> break 
c    (-b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧  p_600) -> break
c  in CNF:
c     b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 13643 -13644  13645 -600 1162 0


c  2-1 --> 1
c    (-b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧ -p_600) -> (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0)
c  in CNF:
c     b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_2
c     b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_1
c     b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨  b^{20, 31}_0
c  in DIMACS:
 13643 -13644  13645  600 -13646 0
 13643 -13644  13645  600 -13647 0
 13643 -13644  13645  600  13648 0

c  1-1 --> 0
c    (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0 ∧ -p_600) -> (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧ -b^{20, 31}_0)
c  in CNF:
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_2
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_1
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_0
c  in DIMACS:
 13643  13644 -13645  600 -13646 0
 13643  13644 -13645  600 -13647 0
 13643  13644 -13645  600 -13648 0

c  0-1 --> -1
c    (-b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧ -p_600) -> ( b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0)
c  in CNF:
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨  b^{20, 31}_2
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_1
c     b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨  b^{20, 31}_0
c  in DIMACS:
 13643  13644  13645  600  13646 0
 13643  13644  13645  600 -13647 0
 13643  13644  13645  600  13648 0

c  -1-1 --> -2
c    ( b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧  b^{20, 30}_0 ∧ -p_600) -> ( b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0)
c  in CNF:
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨  b^{20, 31}_2
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨  b^{20, 31}_1
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨  p_600 ∨ -b^{20, 31}_0
c  in DIMACS:
-13643  13644 -13645  600  13646 0
-13643  13644 -13645  600  13647 0
-13643  13644 -13645  600 -13648 0

c  -2-1 --> break 
c    ( b^{20, 30}_2 ∧  b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨  b^{20, 30}_0 ∨  p_600 ∨ break
c  in DIMACS:
-13643 -13644  13645  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 30}_2 ∧ -b^{20, 30}_1 ∧ -b^{20, 30}_0 ∧ true) 
c  in CNF:
c    -b^{20, 30}_2 ∨  b^{20, 30}_1 ∨  b^{20, 30}_0 ∨ false 
c  in DIMACS:
-13643  13644  13645  0

c  3 does not represent an automaton state.
c    -(-b^{20, 30}_2 ∧  b^{20, 30}_1 ∧  b^{20, 30}_0 ∧ true) 
c  in CNF:
c     b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ false 
c  in DIMACS:
 13643 -13644 -13645  0
c  -3 does not represent an automaton state.
c    -( b^{20, 30}_2 ∧  b^{20, 30}_1 ∧  b^{20, 30}_0 ∧ true) 
c  in CNF:
c    -b^{20, 30}_2 ∨ -b^{20, 30}_1 ∨ -b^{20, 30}_0 ∨ false 
c  in DIMACS:
-13643 -13644 -13645  0

c i = 31
c  -2+1 --> -1
c    ( b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧  p_620) -> ( b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0)
c  in CNF:
c    -b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨  b^{20, 32}_2
c    -b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_1
c    -b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨  b^{20, 32}_0
c  in DIMACS:
-13646 -13647  13648 -620  13649 0
-13646 -13647  13648 -620 -13650 0
-13646 -13647  13648 -620  13651 0

c  -1+1 --> 0
c    ( b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0 ∧  p_620) -> (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧ -b^{20, 32}_0)
c  in CNF:
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_2
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_1
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_0
c  in DIMACS:
-13646  13647 -13648 -620 -13649 0
-13646  13647 -13648 -620 -13650 0
-13646  13647 -13648 -620 -13651 0

c  0+1 --> 1
c    (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧  p_620) -> (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0)
c  in CNF:
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_2
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_1
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨  b^{20, 32}_0
c  in DIMACS:
 13646  13647  13648 -620 -13649 0
 13646  13647  13648 -620 -13650 0
 13646  13647  13648 -620  13651 0

c  1+1 --> 2
c    (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0 ∧  p_620) -> (-b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0)
c  in CNF:
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_2
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨  b^{20, 32}_1
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ -p_620 ∨ -b^{20, 32}_0
c  in DIMACS:
 13646  13647 -13648 -620 -13649 0
 13646  13647 -13648 -620  13650 0
 13646  13647 -13648 -620 -13651 0

c  2+1 --> break 
c    (-b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧  p_620) -> break
c  in CNF:
c     b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 13646 -13647  13648 -620 1162 0


c  2-1 --> 1
c    (-b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧ -p_620) -> (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0)
c  in CNF:
c     b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_2
c     b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_1
c     b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨  b^{20, 32}_0
c  in DIMACS:
 13646 -13647  13648  620 -13649 0
 13646 -13647  13648  620 -13650 0
 13646 -13647  13648  620  13651 0

c  1-1 --> 0
c    (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0 ∧ -p_620) -> (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧ -b^{20, 32}_0)
c  in CNF:
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_2
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_1
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_0
c  in DIMACS:
 13646  13647 -13648  620 -13649 0
 13646  13647 -13648  620 -13650 0
 13646  13647 -13648  620 -13651 0

c  0-1 --> -1
c    (-b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧ -p_620) -> ( b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0)
c  in CNF:
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨  b^{20, 32}_2
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_1
c     b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨  b^{20, 32}_0
c  in DIMACS:
 13646  13647  13648  620  13649 0
 13646  13647  13648  620 -13650 0
 13646  13647  13648  620  13651 0

c  -1-1 --> -2
c    ( b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧  b^{20, 31}_0 ∧ -p_620) -> ( b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0)
c  in CNF:
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨  b^{20, 32}_2
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨  b^{20, 32}_1
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨  p_620 ∨ -b^{20, 32}_0
c  in DIMACS:
-13646  13647 -13648  620  13649 0
-13646  13647 -13648  620  13650 0
-13646  13647 -13648  620 -13651 0

c  -2-1 --> break 
c    ( b^{20, 31}_2 ∧  b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨  b^{20, 31}_0 ∨  p_620 ∨ break
c  in DIMACS:
-13646 -13647  13648  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 31}_2 ∧ -b^{20, 31}_1 ∧ -b^{20, 31}_0 ∧ true) 
c  in CNF:
c    -b^{20, 31}_2 ∨  b^{20, 31}_1 ∨  b^{20, 31}_0 ∨ false 
c  in DIMACS:
-13646  13647  13648  0

c  3 does not represent an automaton state.
c    -(-b^{20, 31}_2 ∧  b^{20, 31}_1 ∧  b^{20, 31}_0 ∧ true) 
c  in CNF:
c     b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ false 
c  in DIMACS:
 13646 -13647 -13648  0
c  -3 does not represent an automaton state.
c    -( b^{20, 31}_2 ∧  b^{20, 31}_1 ∧  b^{20, 31}_0 ∧ true) 
c  in CNF:
c    -b^{20, 31}_2 ∨ -b^{20, 31}_1 ∨ -b^{20, 31}_0 ∨ false 
c  in DIMACS:
-13646 -13647 -13648  0

c i = 32
c  -2+1 --> -1
c    ( b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧  p_640) -> ( b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0)
c  in CNF:
c    -b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨  b^{20, 33}_2
c    -b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_1
c    -b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨  b^{20, 33}_0
c  in DIMACS:
-13649 -13650  13651 -640  13652 0
-13649 -13650  13651 -640 -13653 0
-13649 -13650  13651 -640  13654 0

c  -1+1 --> 0
c    ( b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0 ∧  p_640) -> (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧ -b^{20, 33}_0)
c  in CNF:
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_2
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_1
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_0
c  in DIMACS:
-13649  13650 -13651 -640 -13652 0
-13649  13650 -13651 -640 -13653 0
-13649  13650 -13651 -640 -13654 0

c  0+1 --> 1
c    (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧  p_640) -> (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0)
c  in CNF:
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_2
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_1
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨  b^{20, 33}_0
c  in DIMACS:
 13649  13650  13651 -640 -13652 0
 13649  13650  13651 -640 -13653 0
 13649  13650  13651 -640  13654 0

c  1+1 --> 2
c    (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0 ∧  p_640) -> (-b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0)
c  in CNF:
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_2
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨  b^{20, 33}_1
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ -p_640 ∨ -b^{20, 33}_0
c  in DIMACS:
 13649  13650 -13651 -640 -13652 0
 13649  13650 -13651 -640  13653 0
 13649  13650 -13651 -640 -13654 0

c  2+1 --> break 
c    (-b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧  p_640) -> break
c  in CNF:
c     b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 13649 -13650  13651 -640 1162 0


c  2-1 --> 1
c    (-b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧ -p_640) -> (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0)
c  in CNF:
c     b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_2
c     b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_1
c     b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨  b^{20, 33}_0
c  in DIMACS:
 13649 -13650  13651  640 -13652 0
 13649 -13650  13651  640 -13653 0
 13649 -13650  13651  640  13654 0

c  1-1 --> 0
c    (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0 ∧ -p_640) -> (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧ -b^{20, 33}_0)
c  in CNF:
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_2
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_1
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_0
c  in DIMACS:
 13649  13650 -13651  640 -13652 0
 13649  13650 -13651  640 -13653 0
 13649  13650 -13651  640 -13654 0

c  0-1 --> -1
c    (-b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧ -p_640) -> ( b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0)
c  in CNF:
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨  b^{20, 33}_2
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_1
c     b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨  b^{20, 33}_0
c  in DIMACS:
 13649  13650  13651  640  13652 0
 13649  13650  13651  640 -13653 0
 13649  13650  13651  640  13654 0

c  -1-1 --> -2
c    ( b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧  b^{20, 32}_0 ∧ -p_640) -> ( b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0)
c  in CNF:
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨  b^{20, 33}_2
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨  b^{20, 33}_1
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨  p_640 ∨ -b^{20, 33}_0
c  in DIMACS:
-13649  13650 -13651  640  13652 0
-13649  13650 -13651  640  13653 0
-13649  13650 -13651  640 -13654 0

c  -2-1 --> break 
c    ( b^{20, 32}_2 ∧  b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨  b^{20, 32}_0 ∨  p_640 ∨ break
c  in DIMACS:
-13649 -13650  13651  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 32}_2 ∧ -b^{20, 32}_1 ∧ -b^{20, 32}_0 ∧ true) 
c  in CNF:
c    -b^{20, 32}_2 ∨  b^{20, 32}_1 ∨  b^{20, 32}_0 ∨ false 
c  in DIMACS:
-13649  13650  13651  0

c  3 does not represent an automaton state.
c    -(-b^{20, 32}_2 ∧  b^{20, 32}_1 ∧  b^{20, 32}_0 ∧ true) 
c  in CNF:
c     b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ false 
c  in DIMACS:
 13649 -13650 -13651  0
c  -3 does not represent an automaton state.
c    -( b^{20, 32}_2 ∧  b^{20, 32}_1 ∧  b^{20, 32}_0 ∧ true) 
c  in CNF:
c    -b^{20, 32}_2 ∨ -b^{20, 32}_1 ∨ -b^{20, 32}_0 ∨ false 
c  in DIMACS:
-13649 -13650 -13651  0

c i = 33
c  -2+1 --> -1
c    ( b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧  p_660) -> ( b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0)
c  in CNF:
c    -b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨  b^{20, 34}_2
c    -b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_1
c    -b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨  b^{20, 34}_0
c  in DIMACS:
-13652 -13653  13654 -660  13655 0
-13652 -13653  13654 -660 -13656 0
-13652 -13653  13654 -660  13657 0

c  -1+1 --> 0
c    ( b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0 ∧  p_660) -> (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧ -b^{20, 34}_0)
c  in CNF:
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_2
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_1
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_0
c  in DIMACS:
-13652  13653 -13654 -660 -13655 0
-13652  13653 -13654 -660 -13656 0
-13652  13653 -13654 -660 -13657 0

c  0+1 --> 1
c    (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧  p_660) -> (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0)
c  in CNF:
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_2
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_1
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨  b^{20, 34}_0
c  in DIMACS:
 13652  13653  13654 -660 -13655 0
 13652  13653  13654 -660 -13656 0
 13652  13653  13654 -660  13657 0

c  1+1 --> 2
c    (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0 ∧  p_660) -> (-b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0)
c  in CNF:
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_2
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨  b^{20, 34}_1
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ -p_660 ∨ -b^{20, 34}_0
c  in DIMACS:
 13652  13653 -13654 -660 -13655 0
 13652  13653 -13654 -660  13656 0
 13652  13653 -13654 -660 -13657 0

c  2+1 --> break 
c    (-b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧  p_660) -> break
c  in CNF:
c     b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 13652 -13653  13654 -660 1162 0


c  2-1 --> 1
c    (-b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧ -p_660) -> (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0)
c  in CNF:
c     b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_2
c     b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_1
c     b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨  b^{20, 34}_0
c  in DIMACS:
 13652 -13653  13654  660 -13655 0
 13652 -13653  13654  660 -13656 0
 13652 -13653  13654  660  13657 0

c  1-1 --> 0
c    (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0 ∧ -p_660) -> (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧ -b^{20, 34}_0)
c  in CNF:
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_2
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_1
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_0
c  in DIMACS:
 13652  13653 -13654  660 -13655 0
 13652  13653 -13654  660 -13656 0
 13652  13653 -13654  660 -13657 0

c  0-1 --> -1
c    (-b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧ -p_660) -> ( b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0)
c  in CNF:
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨  b^{20, 34}_2
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_1
c     b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨  b^{20, 34}_0
c  in DIMACS:
 13652  13653  13654  660  13655 0
 13652  13653  13654  660 -13656 0
 13652  13653  13654  660  13657 0

c  -1-1 --> -2
c    ( b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧  b^{20, 33}_0 ∧ -p_660) -> ( b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0)
c  in CNF:
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨  b^{20, 34}_2
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨  b^{20, 34}_1
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨  p_660 ∨ -b^{20, 34}_0
c  in DIMACS:
-13652  13653 -13654  660  13655 0
-13652  13653 -13654  660  13656 0
-13652  13653 -13654  660 -13657 0

c  -2-1 --> break 
c    ( b^{20, 33}_2 ∧  b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨  b^{20, 33}_0 ∨  p_660 ∨ break
c  in DIMACS:
-13652 -13653  13654  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 33}_2 ∧ -b^{20, 33}_1 ∧ -b^{20, 33}_0 ∧ true) 
c  in CNF:
c    -b^{20, 33}_2 ∨  b^{20, 33}_1 ∨  b^{20, 33}_0 ∨ false 
c  in DIMACS:
-13652  13653  13654  0

c  3 does not represent an automaton state.
c    -(-b^{20, 33}_2 ∧  b^{20, 33}_1 ∧  b^{20, 33}_0 ∧ true) 
c  in CNF:
c     b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ false 
c  in DIMACS:
 13652 -13653 -13654  0
c  -3 does not represent an automaton state.
c    -( b^{20, 33}_2 ∧  b^{20, 33}_1 ∧  b^{20, 33}_0 ∧ true) 
c  in CNF:
c    -b^{20, 33}_2 ∨ -b^{20, 33}_1 ∨ -b^{20, 33}_0 ∨ false 
c  in DIMACS:
-13652 -13653 -13654  0

c i = 34
c  -2+1 --> -1
c    ( b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧  p_680) -> ( b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0)
c  in CNF:
c    -b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨  b^{20, 35}_2
c    -b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_1
c    -b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨  b^{20, 35}_0
c  in DIMACS:
-13655 -13656  13657 -680  13658 0
-13655 -13656  13657 -680 -13659 0
-13655 -13656  13657 -680  13660 0

c  -1+1 --> 0
c    ( b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0 ∧  p_680) -> (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧ -b^{20, 35}_0)
c  in CNF:
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_2
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_1
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_0
c  in DIMACS:
-13655  13656 -13657 -680 -13658 0
-13655  13656 -13657 -680 -13659 0
-13655  13656 -13657 -680 -13660 0

c  0+1 --> 1
c    (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧  p_680) -> (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0)
c  in CNF:
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_2
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_1
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨  b^{20, 35}_0
c  in DIMACS:
 13655  13656  13657 -680 -13658 0
 13655  13656  13657 -680 -13659 0
 13655  13656  13657 -680  13660 0

c  1+1 --> 2
c    (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0 ∧  p_680) -> (-b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0)
c  in CNF:
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_2
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨  b^{20, 35}_1
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ -p_680 ∨ -b^{20, 35}_0
c  in DIMACS:
 13655  13656 -13657 -680 -13658 0
 13655  13656 -13657 -680  13659 0
 13655  13656 -13657 -680 -13660 0

c  2+1 --> break 
c    (-b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧  p_680) -> break
c  in CNF:
c     b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 13655 -13656  13657 -680 1162 0


c  2-1 --> 1
c    (-b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧ -p_680) -> (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0)
c  in CNF:
c     b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_2
c     b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_1
c     b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨  b^{20, 35}_0
c  in DIMACS:
 13655 -13656  13657  680 -13658 0
 13655 -13656  13657  680 -13659 0
 13655 -13656  13657  680  13660 0

c  1-1 --> 0
c    (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0 ∧ -p_680) -> (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧ -b^{20, 35}_0)
c  in CNF:
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_2
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_1
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_0
c  in DIMACS:
 13655  13656 -13657  680 -13658 0
 13655  13656 -13657  680 -13659 0
 13655  13656 -13657  680 -13660 0

c  0-1 --> -1
c    (-b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧ -p_680) -> ( b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0)
c  in CNF:
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨  b^{20, 35}_2
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_1
c     b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨  b^{20, 35}_0
c  in DIMACS:
 13655  13656  13657  680  13658 0
 13655  13656  13657  680 -13659 0
 13655  13656  13657  680  13660 0

c  -1-1 --> -2
c    ( b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧  b^{20, 34}_0 ∧ -p_680) -> ( b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0)
c  in CNF:
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨  b^{20, 35}_2
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨  b^{20, 35}_1
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨  p_680 ∨ -b^{20, 35}_0
c  in DIMACS:
-13655  13656 -13657  680  13658 0
-13655  13656 -13657  680  13659 0
-13655  13656 -13657  680 -13660 0

c  -2-1 --> break 
c    ( b^{20, 34}_2 ∧  b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨  b^{20, 34}_0 ∨  p_680 ∨ break
c  in DIMACS:
-13655 -13656  13657  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 34}_2 ∧ -b^{20, 34}_1 ∧ -b^{20, 34}_0 ∧ true) 
c  in CNF:
c    -b^{20, 34}_2 ∨  b^{20, 34}_1 ∨  b^{20, 34}_0 ∨ false 
c  in DIMACS:
-13655  13656  13657  0

c  3 does not represent an automaton state.
c    -(-b^{20, 34}_2 ∧  b^{20, 34}_1 ∧  b^{20, 34}_0 ∧ true) 
c  in CNF:
c     b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ false 
c  in DIMACS:
 13655 -13656 -13657  0
c  -3 does not represent an automaton state.
c    -( b^{20, 34}_2 ∧  b^{20, 34}_1 ∧  b^{20, 34}_0 ∧ true) 
c  in CNF:
c    -b^{20, 34}_2 ∨ -b^{20, 34}_1 ∨ -b^{20, 34}_0 ∨ false 
c  in DIMACS:
-13655 -13656 -13657  0

c i = 35
c  -2+1 --> -1
c    ( b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧  p_700) -> ( b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0)
c  in CNF:
c    -b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨  b^{20, 36}_2
c    -b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_1
c    -b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨  b^{20, 36}_0
c  in DIMACS:
-13658 -13659  13660 -700  13661 0
-13658 -13659  13660 -700 -13662 0
-13658 -13659  13660 -700  13663 0

c  -1+1 --> 0
c    ( b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0 ∧  p_700) -> (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧ -b^{20, 36}_0)
c  in CNF:
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_2
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_1
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_0
c  in DIMACS:
-13658  13659 -13660 -700 -13661 0
-13658  13659 -13660 -700 -13662 0
-13658  13659 -13660 -700 -13663 0

c  0+1 --> 1
c    (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧  p_700) -> (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0)
c  in CNF:
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_2
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_1
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨  b^{20, 36}_0
c  in DIMACS:
 13658  13659  13660 -700 -13661 0
 13658  13659  13660 -700 -13662 0
 13658  13659  13660 -700  13663 0

c  1+1 --> 2
c    (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0 ∧  p_700) -> (-b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0)
c  in CNF:
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_2
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨  b^{20, 36}_1
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ -p_700 ∨ -b^{20, 36}_0
c  in DIMACS:
 13658  13659 -13660 -700 -13661 0
 13658  13659 -13660 -700  13662 0
 13658  13659 -13660 -700 -13663 0

c  2+1 --> break 
c    (-b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧  p_700) -> break
c  in CNF:
c     b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 13658 -13659  13660 -700 1162 0


c  2-1 --> 1
c    (-b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧ -p_700) -> (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0)
c  in CNF:
c     b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_2
c     b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_1
c     b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨  b^{20, 36}_0
c  in DIMACS:
 13658 -13659  13660  700 -13661 0
 13658 -13659  13660  700 -13662 0
 13658 -13659  13660  700  13663 0

c  1-1 --> 0
c    (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0 ∧ -p_700) -> (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧ -b^{20, 36}_0)
c  in CNF:
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_2
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_1
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_0
c  in DIMACS:
 13658  13659 -13660  700 -13661 0
 13658  13659 -13660  700 -13662 0
 13658  13659 -13660  700 -13663 0

c  0-1 --> -1
c    (-b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧ -p_700) -> ( b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0)
c  in CNF:
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨  b^{20, 36}_2
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_1
c     b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨  b^{20, 36}_0
c  in DIMACS:
 13658  13659  13660  700  13661 0
 13658  13659  13660  700 -13662 0
 13658  13659  13660  700  13663 0

c  -1-1 --> -2
c    ( b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧  b^{20, 35}_0 ∧ -p_700) -> ( b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0)
c  in CNF:
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨  b^{20, 36}_2
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨  b^{20, 36}_1
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨  p_700 ∨ -b^{20, 36}_0
c  in DIMACS:
-13658  13659 -13660  700  13661 0
-13658  13659 -13660  700  13662 0
-13658  13659 -13660  700 -13663 0

c  -2-1 --> break 
c    ( b^{20, 35}_2 ∧  b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨  b^{20, 35}_0 ∨  p_700 ∨ break
c  in DIMACS:
-13658 -13659  13660  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 35}_2 ∧ -b^{20, 35}_1 ∧ -b^{20, 35}_0 ∧ true) 
c  in CNF:
c    -b^{20, 35}_2 ∨  b^{20, 35}_1 ∨  b^{20, 35}_0 ∨ false 
c  in DIMACS:
-13658  13659  13660  0

c  3 does not represent an automaton state.
c    -(-b^{20, 35}_2 ∧  b^{20, 35}_1 ∧  b^{20, 35}_0 ∧ true) 
c  in CNF:
c     b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ false 
c  in DIMACS:
 13658 -13659 -13660  0
c  -3 does not represent an automaton state.
c    -( b^{20, 35}_2 ∧  b^{20, 35}_1 ∧  b^{20, 35}_0 ∧ true) 
c  in CNF:
c    -b^{20, 35}_2 ∨ -b^{20, 35}_1 ∨ -b^{20, 35}_0 ∨ false 
c  in DIMACS:
-13658 -13659 -13660  0

c i = 36
c  -2+1 --> -1
c    ( b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧  p_720) -> ( b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0)
c  in CNF:
c    -b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨  b^{20, 37}_2
c    -b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_1
c    -b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨  b^{20, 37}_0
c  in DIMACS:
-13661 -13662  13663 -720  13664 0
-13661 -13662  13663 -720 -13665 0
-13661 -13662  13663 -720  13666 0

c  -1+1 --> 0
c    ( b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0 ∧  p_720) -> (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧ -b^{20, 37}_0)
c  in CNF:
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_2
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_1
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_0
c  in DIMACS:
-13661  13662 -13663 -720 -13664 0
-13661  13662 -13663 -720 -13665 0
-13661  13662 -13663 -720 -13666 0

c  0+1 --> 1
c    (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧  p_720) -> (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0)
c  in CNF:
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_2
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_1
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨  b^{20, 37}_0
c  in DIMACS:
 13661  13662  13663 -720 -13664 0
 13661  13662  13663 -720 -13665 0
 13661  13662  13663 -720  13666 0

c  1+1 --> 2
c    (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0 ∧  p_720) -> (-b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0)
c  in CNF:
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_2
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨  b^{20, 37}_1
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ -p_720 ∨ -b^{20, 37}_0
c  in DIMACS:
 13661  13662 -13663 -720 -13664 0
 13661  13662 -13663 -720  13665 0
 13661  13662 -13663 -720 -13666 0

c  2+1 --> break 
c    (-b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧  p_720) -> break
c  in CNF:
c     b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 13661 -13662  13663 -720 1162 0


c  2-1 --> 1
c    (-b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧ -p_720) -> (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0)
c  in CNF:
c     b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_2
c     b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_1
c     b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨  b^{20, 37}_0
c  in DIMACS:
 13661 -13662  13663  720 -13664 0
 13661 -13662  13663  720 -13665 0
 13661 -13662  13663  720  13666 0

c  1-1 --> 0
c    (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0 ∧ -p_720) -> (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧ -b^{20, 37}_0)
c  in CNF:
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_2
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_1
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_0
c  in DIMACS:
 13661  13662 -13663  720 -13664 0
 13661  13662 -13663  720 -13665 0
 13661  13662 -13663  720 -13666 0

c  0-1 --> -1
c    (-b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧ -p_720) -> ( b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0)
c  in CNF:
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨  b^{20, 37}_2
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_1
c     b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨  b^{20, 37}_0
c  in DIMACS:
 13661  13662  13663  720  13664 0
 13661  13662  13663  720 -13665 0
 13661  13662  13663  720  13666 0

c  -1-1 --> -2
c    ( b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧  b^{20, 36}_0 ∧ -p_720) -> ( b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0)
c  in CNF:
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨  b^{20, 37}_2
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨  b^{20, 37}_1
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨  p_720 ∨ -b^{20, 37}_0
c  in DIMACS:
-13661  13662 -13663  720  13664 0
-13661  13662 -13663  720  13665 0
-13661  13662 -13663  720 -13666 0

c  -2-1 --> break 
c    ( b^{20, 36}_2 ∧  b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨  b^{20, 36}_0 ∨  p_720 ∨ break
c  in DIMACS:
-13661 -13662  13663  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 36}_2 ∧ -b^{20, 36}_1 ∧ -b^{20, 36}_0 ∧ true) 
c  in CNF:
c    -b^{20, 36}_2 ∨  b^{20, 36}_1 ∨  b^{20, 36}_0 ∨ false 
c  in DIMACS:
-13661  13662  13663  0

c  3 does not represent an automaton state.
c    -(-b^{20, 36}_2 ∧  b^{20, 36}_1 ∧  b^{20, 36}_0 ∧ true) 
c  in CNF:
c     b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ false 
c  in DIMACS:
 13661 -13662 -13663  0
c  -3 does not represent an automaton state.
c    -( b^{20, 36}_2 ∧  b^{20, 36}_1 ∧  b^{20, 36}_0 ∧ true) 
c  in CNF:
c    -b^{20, 36}_2 ∨ -b^{20, 36}_1 ∨ -b^{20, 36}_0 ∨ false 
c  in DIMACS:
-13661 -13662 -13663  0

c i = 37
c  -2+1 --> -1
c    ( b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧  p_740) -> ( b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0)
c  in CNF:
c    -b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨  b^{20, 38}_2
c    -b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_1
c    -b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨  b^{20, 38}_0
c  in DIMACS:
-13664 -13665  13666 -740  13667 0
-13664 -13665  13666 -740 -13668 0
-13664 -13665  13666 -740  13669 0

c  -1+1 --> 0
c    ( b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0 ∧  p_740) -> (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧ -b^{20, 38}_0)
c  in CNF:
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_2
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_1
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_0
c  in DIMACS:
-13664  13665 -13666 -740 -13667 0
-13664  13665 -13666 -740 -13668 0
-13664  13665 -13666 -740 -13669 0

c  0+1 --> 1
c    (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧  p_740) -> (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0)
c  in CNF:
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_2
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_1
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨  b^{20, 38}_0
c  in DIMACS:
 13664  13665  13666 -740 -13667 0
 13664  13665  13666 -740 -13668 0
 13664  13665  13666 -740  13669 0

c  1+1 --> 2
c    (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0 ∧  p_740) -> (-b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0)
c  in CNF:
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_2
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨  b^{20, 38}_1
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ -p_740 ∨ -b^{20, 38}_0
c  in DIMACS:
 13664  13665 -13666 -740 -13667 0
 13664  13665 -13666 -740  13668 0
 13664  13665 -13666 -740 -13669 0

c  2+1 --> break 
c    (-b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧  p_740) -> break
c  in CNF:
c     b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 13664 -13665  13666 -740 1162 0


c  2-1 --> 1
c    (-b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧ -p_740) -> (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0)
c  in CNF:
c     b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_2
c     b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_1
c     b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨  b^{20, 38}_0
c  in DIMACS:
 13664 -13665  13666  740 -13667 0
 13664 -13665  13666  740 -13668 0
 13664 -13665  13666  740  13669 0

c  1-1 --> 0
c    (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0 ∧ -p_740) -> (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧ -b^{20, 38}_0)
c  in CNF:
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_2
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_1
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_0
c  in DIMACS:
 13664  13665 -13666  740 -13667 0
 13664  13665 -13666  740 -13668 0
 13664  13665 -13666  740 -13669 0

c  0-1 --> -1
c    (-b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧ -p_740) -> ( b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0)
c  in CNF:
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨  b^{20, 38}_2
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_1
c     b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨  b^{20, 38}_0
c  in DIMACS:
 13664  13665  13666  740  13667 0
 13664  13665  13666  740 -13668 0
 13664  13665  13666  740  13669 0

c  -1-1 --> -2
c    ( b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧  b^{20, 37}_0 ∧ -p_740) -> ( b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0)
c  in CNF:
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨  b^{20, 38}_2
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨  b^{20, 38}_1
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨  p_740 ∨ -b^{20, 38}_0
c  in DIMACS:
-13664  13665 -13666  740  13667 0
-13664  13665 -13666  740  13668 0
-13664  13665 -13666  740 -13669 0

c  -2-1 --> break 
c    ( b^{20, 37}_2 ∧  b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨  b^{20, 37}_0 ∨  p_740 ∨ break
c  in DIMACS:
-13664 -13665  13666  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 37}_2 ∧ -b^{20, 37}_1 ∧ -b^{20, 37}_0 ∧ true) 
c  in CNF:
c    -b^{20, 37}_2 ∨  b^{20, 37}_1 ∨  b^{20, 37}_0 ∨ false 
c  in DIMACS:
-13664  13665  13666  0

c  3 does not represent an automaton state.
c    -(-b^{20, 37}_2 ∧  b^{20, 37}_1 ∧  b^{20, 37}_0 ∧ true) 
c  in CNF:
c     b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ false 
c  in DIMACS:
 13664 -13665 -13666  0
c  -3 does not represent an automaton state.
c    -( b^{20, 37}_2 ∧  b^{20, 37}_1 ∧  b^{20, 37}_0 ∧ true) 
c  in CNF:
c    -b^{20, 37}_2 ∨ -b^{20, 37}_1 ∨ -b^{20, 37}_0 ∨ false 
c  in DIMACS:
-13664 -13665 -13666  0

c i = 38
c  -2+1 --> -1
c    ( b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧  p_760) -> ( b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0)
c  in CNF:
c    -b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨  b^{20, 39}_2
c    -b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_1
c    -b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨  b^{20, 39}_0
c  in DIMACS:
-13667 -13668  13669 -760  13670 0
-13667 -13668  13669 -760 -13671 0
-13667 -13668  13669 -760  13672 0

c  -1+1 --> 0
c    ( b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0 ∧  p_760) -> (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧ -b^{20, 39}_0)
c  in CNF:
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_2
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_1
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_0
c  in DIMACS:
-13667  13668 -13669 -760 -13670 0
-13667  13668 -13669 -760 -13671 0
-13667  13668 -13669 -760 -13672 0

c  0+1 --> 1
c    (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧  p_760) -> (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0)
c  in CNF:
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_2
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_1
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨  b^{20, 39}_0
c  in DIMACS:
 13667  13668  13669 -760 -13670 0
 13667  13668  13669 -760 -13671 0
 13667  13668  13669 -760  13672 0

c  1+1 --> 2
c    (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0 ∧  p_760) -> (-b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0)
c  in CNF:
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_2
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨  b^{20, 39}_1
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ -p_760 ∨ -b^{20, 39}_0
c  in DIMACS:
 13667  13668 -13669 -760 -13670 0
 13667  13668 -13669 -760  13671 0
 13667  13668 -13669 -760 -13672 0

c  2+1 --> break 
c    (-b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧  p_760) -> break
c  in CNF:
c     b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 13667 -13668  13669 -760 1162 0


c  2-1 --> 1
c    (-b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧ -p_760) -> (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0)
c  in CNF:
c     b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_2
c     b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_1
c     b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨  b^{20, 39}_0
c  in DIMACS:
 13667 -13668  13669  760 -13670 0
 13667 -13668  13669  760 -13671 0
 13667 -13668  13669  760  13672 0

c  1-1 --> 0
c    (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0 ∧ -p_760) -> (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧ -b^{20, 39}_0)
c  in CNF:
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_2
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_1
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_0
c  in DIMACS:
 13667  13668 -13669  760 -13670 0
 13667  13668 -13669  760 -13671 0
 13667  13668 -13669  760 -13672 0

c  0-1 --> -1
c    (-b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧ -p_760) -> ( b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0)
c  in CNF:
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨  b^{20, 39}_2
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_1
c     b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨  b^{20, 39}_0
c  in DIMACS:
 13667  13668  13669  760  13670 0
 13667  13668  13669  760 -13671 0
 13667  13668  13669  760  13672 0

c  -1-1 --> -2
c    ( b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧  b^{20, 38}_0 ∧ -p_760) -> ( b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0)
c  in CNF:
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨  b^{20, 39}_2
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨  b^{20, 39}_1
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨  p_760 ∨ -b^{20, 39}_0
c  in DIMACS:
-13667  13668 -13669  760  13670 0
-13667  13668 -13669  760  13671 0
-13667  13668 -13669  760 -13672 0

c  -2-1 --> break 
c    ( b^{20, 38}_2 ∧  b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨  b^{20, 38}_0 ∨  p_760 ∨ break
c  in DIMACS:
-13667 -13668  13669  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 38}_2 ∧ -b^{20, 38}_1 ∧ -b^{20, 38}_0 ∧ true) 
c  in CNF:
c    -b^{20, 38}_2 ∨  b^{20, 38}_1 ∨  b^{20, 38}_0 ∨ false 
c  in DIMACS:
-13667  13668  13669  0

c  3 does not represent an automaton state.
c    -(-b^{20, 38}_2 ∧  b^{20, 38}_1 ∧  b^{20, 38}_0 ∧ true) 
c  in CNF:
c     b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ false 
c  in DIMACS:
 13667 -13668 -13669  0
c  -3 does not represent an automaton state.
c    -( b^{20, 38}_2 ∧  b^{20, 38}_1 ∧  b^{20, 38}_0 ∧ true) 
c  in CNF:
c    -b^{20, 38}_2 ∨ -b^{20, 38}_1 ∨ -b^{20, 38}_0 ∨ false 
c  in DIMACS:
-13667 -13668 -13669  0

c i = 39
c  -2+1 --> -1
c    ( b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧  p_780) -> ( b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0)
c  in CNF:
c    -b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨  b^{20, 40}_2
c    -b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_1
c    -b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨  b^{20, 40}_0
c  in DIMACS:
-13670 -13671  13672 -780  13673 0
-13670 -13671  13672 -780 -13674 0
-13670 -13671  13672 -780  13675 0

c  -1+1 --> 0
c    ( b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0 ∧  p_780) -> (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧ -b^{20, 40}_0)
c  in CNF:
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_2
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_1
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_0
c  in DIMACS:
-13670  13671 -13672 -780 -13673 0
-13670  13671 -13672 -780 -13674 0
-13670  13671 -13672 -780 -13675 0

c  0+1 --> 1
c    (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧  p_780) -> (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0)
c  in CNF:
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_2
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_1
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨  b^{20, 40}_0
c  in DIMACS:
 13670  13671  13672 -780 -13673 0
 13670  13671  13672 -780 -13674 0
 13670  13671  13672 -780  13675 0

c  1+1 --> 2
c    (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0 ∧  p_780) -> (-b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0)
c  in CNF:
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_2
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨  b^{20, 40}_1
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ -p_780 ∨ -b^{20, 40}_0
c  in DIMACS:
 13670  13671 -13672 -780 -13673 0
 13670  13671 -13672 -780  13674 0
 13670  13671 -13672 -780 -13675 0

c  2+1 --> break 
c    (-b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧  p_780) -> break
c  in CNF:
c     b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 13670 -13671  13672 -780 1162 0


c  2-1 --> 1
c    (-b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧ -p_780) -> (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0)
c  in CNF:
c     b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_2
c     b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_1
c     b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨  b^{20, 40}_0
c  in DIMACS:
 13670 -13671  13672  780 -13673 0
 13670 -13671  13672  780 -13674 0
 13670 -13671  13672  780  13675 0

c  1-1 --> 0
c    (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0 ∧ -p_780) -> (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧ -b^{20, 40}_0)
c  in CNF:
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_2
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_1
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_0
c  in DIMACS:
 13670  13671 -13672  780 -13673 0
 13670  13671 -13672  780 -13674 0
 13670  13671 -13672  780 -13675 0

c  0-1 --> -1
c    (-b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧ -p_780) -> ( b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0)
c  in CNF:
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨  b^{20, 40}_2
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_1
c     b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨  b^{20, 40}_0
c  in DIMACS:
 13670  13671  13672  780  13673 0
 13670  13671  13672  780 -13674 0
 13670  13671  13672  780  13675 0

c  -1-1 --> -2
c    ( b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧  b^{20, 39}_0 ∧ -p_780) -> ( b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0)
c  in CNF:
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨  b^{20, 40}_2
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨  b^{20, 40}_1
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨  p_780 ∨ -b^{20, 40}_0
c  in DIMACS:
-13670  13671 -13672  780  13673 0
-13670  13671 -13672  780  13674 0
-13670  13671 -13672  780 -13675 0

c  -2-1 --> break 
c    ( b^{20, 39}_2 ∧  b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨  b^{20, 39}_0 ∨  p_780 ∨ break
c  in DIMACS:
-13670 -13671  13672  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 39}_2 ∧ -b^{20, 39}_1 ∧ -b^{20, 39}_0 ∧ true) 
c  in CNF:
c    -b^{20, 39}_2 ∨  b^{20, 39}_1 ∨  b^{20, 39}_0 ∨ false 
c  in DIMACS:
-13670  13671  13672  0

c  3 does not represent an automaton state.
c    -(-b^{20, 39}_2 ∧  b^{20, 39}_1 ∧  b^{20, 39}_0 ∧ true) 
c  in CNF:
c     b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ false 
c  in DIMACS:
 13670 -13671 -13672  0
c  -3 does not represent an automaton state.
c    -( b^{20, 39}_2 ∧  b^{20, 39}_1 ∧  b^{20, 39}_0 ∧ true) 
c  in CNF:
c    -b^{20, 39}_2 ∨ -b^{20, 39}_1 ∨ -b^{20, 39}_0 ∨ false 
c  in DIMACS:
-13670 -13671 -13672  0

c i = 40
c  -2+1 --> -1
c    ( b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧  p_800) -> ( b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0)
c  in CNF:
c    -b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨  b^{20, 41}_2
c    -b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_1
c    -b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨  b^{20, 41}_0
c  in DIMACS:
-13673 -13674  13675 -800  13676 0
-13673 -13674  13675 -800 -13677 0
-13673 -13674  13675 -800  13678 0

c  -1+1 --> 0
c    ( b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0 ∧  p_800) -> (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧ -b^{20, 41}_0)
c  in CNF:
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_2
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_1
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_0
c  in DIMACS:
-13673  13674 -13675 -800 -13676 0
-13673  13674 -13675 -800 -13677 0
-13673  13674 -13675 -800 -13678 0

c  0+1 --> 1
c    (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧  p_800) -> (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0)
c  in CNF:
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_2
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_1
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨  b^{20, 41}_0
c  in DIMACS:
 13673  13674  13675 -800 -13676 0
 13673  13674  13675 -800 -13677 0
 13673  13674  13675 -800  13678 0

c  1+1 --> 2
c    (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0 ∧  p_800) -> (-b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0)
c  in CNF:
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_2
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨  b^{20, 41}_1
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ -p_800 ∨ -b^{20, 41}_0
c  in DIMACS:
 13673  13674 -13675 -800 -13676 0
 13673  13674 -13675 -800  13677 0
 13673  13674 -13675 -800 -13678 0

c  2+1 --> break 
c    (-b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧  p_800) -> break
c  in CNF:
c     b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 13673 -13674  13675 -800 1162 0


c  2-1 --> 1
c    (-b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧ -p_800) -> (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0)
c  in CNF:
c     b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_2
c     b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_1
c     b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨  b^{20, 41}_0
c  in DIMACS:
 13673 -13674  13675  800 -13676 0
 13673 -13674  13675  800 -13677 0
 13673 -13674  13675  800  13678 0

c  1-1 --> 0
c    (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0 ∧ -p_800) -> (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧ -b^{20, 41}_0)
c  in CNF:
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_2
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_1
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_0
c  in DIMACS:
 13673  13674 -13675  800 -13676 0
 13673  13674 -13675  800 -13677 0
 13673  13674 -13675  800 -13678 0

c  0-1 --> -1
c    (-b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧ -p_800) -> ( b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0)
c  in CNF:
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨  b^{20, 41}_2
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_1
c     b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨  b^{20, 41}_0
c  in DIMACS:
 13673  13674  13675  800  13676 0
 13673  13674  13675  800 -13677 0
 13673  13674  13675  800  13678 0

c  -1-1 --> -2
c    ( b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧  b^{20, 40}_0 ∧ -p_800) -> ( b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0)
c  in CNF:
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨  b^{20, 41}_2
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨  b^{20, 41}_1
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨  p_800 ∨ -b^{20, 41}_0
c  in DIMACS:
-13673  13674 -13675  800  13676 0
-13673  13674 -13675  800  13677 0
-13673  13674 -13675  800 -13678 0

c  -2-1 --> break 
c    ( b^{20, 40}_2 ∧  b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨  b^{20, 40}_0 ∨  p_800 ∨ break
c  in DIMACS:
-13673 -13674  13675  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 40}_2 ∧ -b^{20, 40}_1 ∧ -b^{20, 40}_0 ∧ true) 
c  in CNF:
c    -b^{20, 40}_2 ∨  b^{20, 40}_1 ∨  b^{20, 40}_0 ∨ false 
c  in DIMACS:
-13673  13674  13675  0

c  3 does not represent an automaton state.
c    -(-b^{20, 40}_2 ∧  b^{20, 40}_1 ∧  b^{20, 40}_0 ∧ true) 
c  in CNF:
c     b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ false 
c  in DIMACS:
 13673 -13674 -13675  0
c  -3 does not represent an automaton state.
c    -( b^{20, 40}_2 ∧  b^{20, 40}_1 ∧  b^{20, 40}_0 ∧ true) 
c  in CNF:
c    -b^{20, 40}_2 ∨ -b^{20, 40}_1 ∨ -b^{20, 40}_0 ∨ false 
c  in DIMACS:
-13673 -13674 -13675  0

c i = 41
c  -2+1 --> -1
c    ( b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧  p_820) -> ( b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0)
c  in CNF:
c    -b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨  b^{20, 42}_2
c    -b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_1
c    -b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨  b^{20, 42}_0
c  in DIMACS:
-13676 -13677  13678 -820  13679 0
-13676 -13677  13678 -820 -13680 0
-13676 -13677  13678 -820  13681 0

c  -1+1 --> 0
c    ( b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0 ∧  p_820) -> (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧ -b^{20, 42}_0)
c  in CNF:
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_2
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_1
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_0
c  in DIMACS:
-13676  13677 -13678 -820 -13679 0
-13676  13677 -13678 -820 -13680 0
-13676  13677 -13678 -820 -13681 0

c  0+1 --> 1
c    (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧  p_820) -> (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0)
c  in CNF:
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_2
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_1
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨  b^{20, 42}_0
c  in DIMACS:
 13676  13677  13678 -820 -13679 0
 13676  13677  13678 -820 -13680 0
 13676  13677  13678 -820  13681 0

c  1+1 --> 2
c    (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0 ∧  p_820) -> (-b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0)
c  in CNF:
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_2
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨  b^{20, 42}_1
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ -p_820 ∨ -b^{20, 42}_0
c  in DIMACS:
 13676  13677 -13678 -820 -13679 0
 13676  13677 -13678 -820  13680 0
 13676  13677 -13678 -820 -13681 0

c  2+1 --> break 
c    (-b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧  p_820) -> break
c  in CNF:
c     b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 13676 -13677  13678 -820 1162 0


c  2-1 --> 1
c    (-b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧ -p_820) -> (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0)
c  in CNF:
c     b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_2
c     b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_1
c     b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨  b^{20, 42}_0
c  in DIMACS:
 13676 -13677  13678  820 -13679 0
 13676 -13677  13678  820 -13680 0
 13676 -13677  13678  820  13681 0

c  1-1 --> 0
c    (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0 ∧ -p_820) -> (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧ -b^{20, 42}_0)
c  in CNF:
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_2
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_1
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_0
c  in DIMACS:
 13676  13677 -13678  820 -13679 0
 13676  13677 -13678  820 -13680 0
 13676  13677 -13678  820 -13681 0

c  0-1 --> -1
c    (-b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧ -p_820) -> ( b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0)
c  in CNF:
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨  b^{20, 42}_2
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_1
c     b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨  b^{20, 42}_0
c  in DIMACS:
 13676  13677  13678  820  13679 0
 13676  13677  13678  820 -13680 0
 13676  13677  13678  820  13681 0

c  -1-1 --> -2
c    ( b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧  b^{20, 41}_0 ∧ -p_820) -> ( b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0)
c  in CNF:
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨  b^{20, 42}_2
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨  b^{20, 42}_1
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨  p_820 ∨ -b^{20, 42}_0
c  in DIMACS:
-13676  13677 -13678  820  13679 0
-13676  13677 -13678  820  13680 0
-13676  13677 -13678  820 -13681 0

c  -2-1 --> break 
c    ( b^{20, 41}_2 ∧  b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨  b^{20, 41}_0 ∨  p_820 ∨ break
c  in DIMACS:
-13676 -13677  13678  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 41}_2 ∧ -b^{20, 41}_1 ∧ -b^{20, 41}_0 ∧ true) 
c  in CNF:
c    -b^{20, 41}_2 ∨  b^{20, 41}_1 ∨  b^{20, 41}_0 ∨ false 
c  in DIMACS:
-13676  13677  13678  0

c  3 does not represent an automaton state.
c    -(-b^{20, 41}_2 ∧  b^{20, 41}_1 ∧  b^{20, 41}_0 ∧ true) 
c  in CNF:
c     b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ false 
c  in DIMACS:
 13676 -13677 -13678  0
c  -3 does not represent an automaton state.
c    -( b^{20, 41}_2 ∧  b^{20, 41}_1 ∧  b^{20, 41}_0 ∧ true) 
c  in CNF:
c    -b^{20, 41}_2 ∨ -b^{20, 41}_1 ∨ -b^{20, 41}_0 ∨ false 
c  in DIMACS:
-13676 -13677 -13678  0

c i = 42
c  -2+1 --> -1
c    ( b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧  p_840) -> ( b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0)
c  in CNF:
c    -b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨  b^{20, 43}_2
c    -b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_1
c    -b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨  b^{20, 43}_0
c  in DIMACS:
-13679 -13680  13681 -840  13682 0
-13679 -13680  13681 -840 -13683 0
-13679 -13680  13681 -840  13684 0

c  -1+1 --> 0
c    ( b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0 ∧  p_840) -> (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧ -b^{20, 43}_0)
c  in CNF:
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_2
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_1
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_0
c  in DIMACS:
-13679  13680 -13681 -840 -13682 0
-13679  13680 -13681 -840 -13683 0
-13679  13680 -13681 -840 -13684 0

c  0+1 --> 1
c    (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧  p_840) -> (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0)
c  in CNF:
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_2
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_1
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨  b^{20, 43}_0
c  in DIMACS:
 13679  13680  13681 -840 -13682 0
 13679  13680  13681 -840 -13683 0
 13679  13680  13681 -840  13684 0

c  1+1 --> 2
c    (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0 ∧  p_840) -> (-b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0)
c  in CNF:
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_2
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨  b^{20, 43}_1
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ -p_840 ∨ -b^{20, 43}_0
c  in DIMACS:
 13679  13680 -13681 -840 -13682 0
 13679  13680 -13681 -840  13683 0
 13679  13680 -13681 -840 -13684 0

c  2+1 --> break 
c    (-b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧  p_840) -> break
c  in CNF:
c     b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 13679 -13680  13681 -840 1162 0


c  2-1 --> 1
c    (-b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧ -p_840) -> (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0)
c  in CNF:
c     b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_2
c     b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_1
c     b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨  b^{20, 43}_0
c  in DIMACS:
 13679 -13680  13681  840 -13682 0
 13679 -13680  13681  840 -13683 0
 13679 -13680  13681  840  13684 0

c  1-1 --> 0
c    (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0 ∧ -p_840) -> (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧ -b^{20, 43}_0)
c  in CNF:
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_2
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_1
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_0
c  in DIMACS:
 13679  13680 -13681  840 -13682 0
 13679  13680 -13681  840 -13683 0
 13679  13680 -13681  840 -13684 0

c  0-1 --> -1
c    (-b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧ -p_840) -> ( b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0)
c  in CNF:
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨  b^{20, 43}_2
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_1
c     b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨  b^{20, 43}_0
c  in DIMACS:
 13679  13680  13681  840  13682 0
 13679  13680  13681  840 -13683 0
 13679  13680  13681  840  13684 0

c  -1-1 --> -2
c    ( b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧  b^{20, 42}_0 ∧ -p_840) -> ( b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0)
c  in CNF:
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨  b^{20, 43}_2
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨  b^{20, 43}_1
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨  p_840 ∨ -b^{20, 43}_0
c  in DIMACS:
-13679  13680 -13681  840  13682 0
-13679  13680 -13681  840  13683 0
-13679  13680 -13681  840 -13684 0

c  -2-1 --> break 
c    ( b^{20, 42}_2 ∧  b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨  b^{20, 42}_0 ∨  p_840 ∨ break
c  in DIMACS:
-13679 -13680  13681  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 42}_2 ∧ -b^{20, 42}_1 ∧ -b^{20, 42}_0 ∧ true) 
c  in CNF:
c    -b^{20, 42}_2 ∨  b^{20, 42}_1 ∨  b^{20, 42}_0 ∨ false 
c  in DIMACS:
-13679  13680  13681  0

c  3 does not represent an automaton state.
c    -(-b^{20, 42}_2 ∧  b^{20, 42}_1 ∧  b^{20, 42}_0 ∧ true) 
c  in CNF:
c     b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ false 
c  in DIMACS:
 13679 -13680 -13681  0
c  -3 does not represent an automaton state.
c    -( b^{20, 42}_2 ∧  b^{20, 42}_1 ∧  b^{20, 42}_0 ∧ true) 
c  in CNF:
c    -b^{20, 42}_2 ∨ -b^{20, 42}_1 ∨ -b^{20, 42}_0 ∨ false 
c  in DIMACS:
-13679 -13680 -13681  0

c i = 43
c  -2+1 --> -1
c    ( b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧  p_860) -> ( b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0)
c  in CNF:
c    -b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨  b^{20, 44}_2
c    -b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_1
c    -b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨  b^{20, 44}_0
c  in DIMACS:
-13682 -13683  13684 -860  13685 0
-13682 -13683  13684 -860 -13686 0
-13682 -13683  13684 -860  13687 0

c  -1+1 --> 0
c    ( b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0 ∧  p_860) -> (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧ -b^{20, 44}_0)
c  in CNF:
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_2
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_1
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_0
c  in DIMACS:
-13682  13683 -13684 -860 -13685 0
-13682  13683 -13684 -860 -13686 0
-13682  13683 -13684 -860 -13687 0

c  0+1 --> 1
c    (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧  p_860) -> (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0)
c  in CNF:
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_2
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_1
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨  b^{20, 44}_0
c  in DIMACS:
 13682  13683  13684 -860 -13685 0
 13682  13683  13684 -860 -13686 0
 13682  13683  13684 -860  13687 0

c  1+1 --> 2
c    (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0 ∧  p_860) -> (-b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0)
c  in CNF:
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_2
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨  b^{20, 44}_1
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ -p_860 ∨ -b^{20, 44}_0
c  in DIMACS:
 13682  13683 -13684 -860 -13685 0
 13682  13683 -13684 -860  13686 0
 13682  13683 -13684 -860 -13687 0

c  2+1 --> break 
c    (-b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧  p_860) -> break
c  in CNF:
c     b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 13682 -13683  13684 -860 1162 0


c  2-1 --> 1
c    (-b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧ -p_860) -> (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0)
c  in CNF:
c     b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_2
c     b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_1
c     b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨  b^{20, 44}_0
c  in DIMACS:
 13682 -13683  13684  860 -13685 0
 13682 -13683  13684  860 -13686 0
 13682 -13683  13684  860  13687 0

c  1-1 --> 0
c    (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0 ∧ -p_860) -> (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧ -b^{20, 44}_0)
c  in CNF:
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_2
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_1
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_0
c  in DIMACS:
 13682  13683 -13684  860 -13685 0
 13682  13683 -13684  860 -13686 0
 13682  13683 -13684  860 -13687 0

c  0-1 --> -1
c    (-b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧ -p_860) -> ( b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0)
c  in CNF:
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨  b^{20, 44}_2
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_1
c     b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨  b^{20, 44}_0
c  in DIMACS:
 13682  13683  13684  860  13685 0
 13682  13683  13684  860 -13686 0
 13682  13683  13684  860  13687 0

c  -1-1 --> -2
c    ( b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧  b^{20, 43}_0 ∧ -p_860) -> ( b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0)
c  in CNF:
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨  b^{20, 44}_2
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨  b^{20, 44}_1
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨  p_860 ∨ -b^{20, 44}_0
c  in DIMACS:
-13682  13683 -13684  860  13685 0
-13682  13683 -13684  860  13686 0
-13682  13683 -13684  860 -13687 0

c  -2-1 --> break 
c    ( b^{20, 43}_2 ∧  b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨  b^{20, 43}_0 ∨  p_860 ∨ break
c  in DIMACS:
-13682 -13683  13684  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 43}_2 ∧ -b^{20, 43}_1 ∧ -b^{20, 43}_0 ∧ true) 
c  in CNF:
c    -b^{20, 43}_2 ∨  b^{20, 43}_1 ∨  b^{20, 43}_0 ∨ false 
c  in DIMACS:
-13682  13683  13684  0

c  3 does not represent an automaton state.
c    -(-b^{20, 43}_2 ∧  b^{20, 43}_1 ∧  b^{20, 43}_0 ∧ true) 
c  in CNF:
c     b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ false 
c  in DIMACS:
 13682 -13683 -13684  0
c  -3 does not represent an automaton state.
c    -( b^{20, 43}_2 ∧  b^{20, 43}_1 ∧  b^{20, 43}_0 ∧ true) 
c  in CNF:
c    -b^{20, 43}_2 ∨ -b^{20, 43}_1 ∨ -b^{20, 43}_0 ∨ false 
c  in DIMACS:
-13682 -13683 -13684  0

c i = 44
c  -2+1 --> -1
c    ( b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧  p_880) -> ( b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0)
c  in CNF:
c    -b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨  b^{20, 45}_2
c    -b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_1
c    -b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨  b^{20, 45}_0
c  in DIMACS:
-13685 -13686  13687 -880  13688 0
-13685 -13686  13687 -880 -13689 0
-13685 -13686  13687 -880  13690 0

c  -1+1 --> 0
c    ( b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0 ∧  p_880) -> (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧ -b^{20, 45}_0)
c  in CNF:
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_2
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_1
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_0
c  in DIMACS:
-13685  13686 -13687 -880 -13688 0
-13685  13686 -13687 -880 -13689 0
-13685  13686 -13687 -880 -13690 0

c  0+1 --> 1
c    (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧  p_880) -> (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0)
c  in CNF:
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_2
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_1
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨  b^{20, 45}_0
c  in DIMACS:
 13685  13686  13687 -880 -13688 0
 13685  13686  13687 -880 -13689 0
 13685  13686  13687 -880  13690 0

c  1+1 --> 2
c    (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0 ∧  p_880) -> (-b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0)
c  in CNF:
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_2
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨  b^{20, 45}_1
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ -p_880 ∨ -b^{20, 45}_0
c  in DIMACS:
 13685  13686 -13687 -880 -13688 0
 13685  13686 -13687 -880  13689 0
 13685  13686 -13687 -880 -13690 0

c  2+1 --> break 
c    (-b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧  p_880) -> break
c  in CNF:
c     b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 13685 -13686  13687 -880 1162 0


c  2-1 --> 1
c    (-b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧ -p_880) -> (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0)
c  in CNF:
c     b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_2
c     b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_1
c     b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨  b^{20, 45}_0
c  in DIMACS:
 13685 -13686  13687  880 -13688 0
 13685 -13686  13687  880 -13689 0
 13685 -13686  13687  880  13690 0

c  1-1 --> 0
c    (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0 ∧ -p_880) -> (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧ -b^{20, 45}_0)
c  in CNF:
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_2
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_1
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_0
c  in DIMACS:
 13685  13686 -13687  880 -13688 0
 13685  13686 -13687  880 -13689 0
 13685  13686 -13687  880 -13690 0

c  0-1 --> -1
c    (-b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧ -p_880) -> ( b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0)
c  in CNF:
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨  b^{20, 45}_2
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_1
c     b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨  b^{20, 45}_0
c  in DIMACS:
 13685  13686  13687  880  13688 0
 13685  13686  13687  880 -13689 0
 13685  13686  13687  880  13690 0

c  -1-1 --> -2
c    ( b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧  b^{20, 44}_0 ∧ -p_880) -> ( b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0)
c  in CNF:
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨  b^{20, 45}_2
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨  b^{20, 45}_1
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨  p_880 ∨ -b^{20, 45}_0
c  in DIMACS:
-13685  13686 -13687  880  13688 0
-13685  13686 -13687  880  13689 0
-13685  13686 -13687  880 -13690 0

c  -2-1 --> break 
c    ( b^{20, 44}_2 ∧  b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨  b^{20, 44}_0 ∨  p_880 ∨ break
c  in DIMACS:
-13685 -13686  13687  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 44}_2 ∧ -b^{20, 44}_1 ∧ -b^{20, 44}_0 ∧ true) 
c  in CNF:
c    -b^{20, 44}_2 ∨  b^{20, 44}_1 ∨  b^{20, 44}_0 ∨ false 
c  in DIMACS:
-13685  13686  13687  0

c  3 does not represent an automaton state.
c    -(-b^{20, 44}_2 ∧  b^{20, 44}_1 ∧  b^{20, 44}_0 ∧ true) 
c  in CNF:
c     b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ false 
c  in DIMACS:
 13685 -13686 -13687  0
c  -3 does not represent an automaton state.
c    -( b^{20, 44}_2 ∧  b^{20, 44}_1 ∧  b^{20, 44}_0 ∧ true) 
c  in CNF:
c    -b^{20, 44}_2 ∨ -b^{20, 44}_1 ∨ -b^{20, 44}_0 ∨ false 
c  in DIMACS:
-13685 -13686 -13687  0

c i = 45
c  -2+1 --> -1
c    ( b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧  p_900) -> ( b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0)
c  in CNF:
c    -b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨  b^{20, 46}_2
c    -b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_1
c    -b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨  b^{20, 46}_0
c  in DIMACS:
-13688 -13689  13690 -900  13691 0
-13688 -13689  13690 -900 -13692 0
-13688 -13689  13690 -900  13693 0

c  -1+1 --> 0
c    ( b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0 ∧  p_900) -> (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧ -b^{20, 46}_0)
c  in CNF:
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_2
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_1
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_0
c  in DIMACS:
-13688  13689 -13690 -900 -13691 0
-13688  13689 -13690 -900 -13692 0
-13688  13689 -13690 -900 -13693 0

c  0+1 --> 1
c    (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧  p_900) -> (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0)
c  in CNF:
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_2
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_1
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨  b^{20, 46}_0
c  in DIMACS:
 13688  13689  13690 -900 -13691 0
 13688  13689  13690 -900 -13692 0
 13688  13689  13690 -900  13693 0

c  1+1 --> 2
c    (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0 ∧  p_900) -> (-b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0)
c  in CNF:
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_2
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨  b^{20, 46}_1
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ -p_900 ∨ -b^{20, 46}_0
c  in DIMACS:
 13688  13689 -13690 -900 -13691 0
 13688  13689 -13690 -900  13692 0
 13688  13689 -13690 -900 -13693 0

c  2+1 --> break 
c    (-b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧  p_900) -> break
c  in CNF:
c     b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 13688 -13689  13690 -900 1162 0


c  2-1 --> 1
c    (-b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧ -p_900) -> (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0)
c  in CNF:
c     b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_2
c     b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_1
c     b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨  b^{20, 46}_0
c  in DIMACS:
 13688 -13689  13690  900 -13691 0
 13688 -13689  13690  900 -13692 0
 13688 -13689  13690  900  13693 0

c  1-1 --> 0
c    (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0 ∧ -p_900) -> (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧ -b^{20, 46}_0)
c  in CNF:
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_2
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_1
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_0
c  in DIMACS:
 13688  13689 -13690  900 -13691 0
 13688  13689 -13690  900 -13692 0
 13688  13689 -13690  900 -13693 0

c  0-1 --> -1
c    (-b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧ -p_900) -> ( b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0)
c  in CNF:
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨  b^{20, 46}_2
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_1
c     b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨  b^{20, 46}_0
c  in DIMACS:
 13688  13689  13690  900  13691 0
 13688  13689  13690  900 -13692 0
 13688  13689  13690  900  13693 0

c  -1-1 --> -2
c    ( b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧  b^{20, 45}_0 ∧ -p_900) -> ( b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0)
c  in CNF:
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨  b^{20, 46}_2
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨  b^{20, 46}_1
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨  p_900 ∨ -b^{20, 46}_0
c  in DIMACS:
-13688  13689 -13690  900  13691 0
-13688  13689 -13690  900  13692 0
-13688  13689 -13690  900 -13693 0

c  -2-1 --> break 
c    ( b^{20, 45}_2 ∧  b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨  b^{20, 45}_0 ∨  p_900 ∨ break
c  in DIMACS:
-13688 -13689  13690  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 45}_2 ∧ -b^{20, 45}_1 ∧ -b^{20, 45}_0 ∧ true) 
c  in CNF:
c    -b^{20, 45}_2 ∨  b^{20, 45}_1 ∨  b^{20, 45}_0 ∨ false 
c  in DIMACS:
-13688  13689  13690  0

c  3 does not represent an automaton state.
c    -(-b^{20, 45}_2 ∧  b^{20, 45}_1 ∧  b^{20, 45}_0 ∧ true) 
c  in CNF:
c     b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ false 
c  in DIMACS:
 13688 -13689 -13690  0
c  -3 does not represent an automaton state.
c    -( b^{20, 45}_2 ∧  b^{20, 45}_1 ∧  b^{20, 45}_0 ∧ true) 
c  in CNF:
c    -b^{20, 45}_2 ∨ -b^{20, 45}_1 ∨ -b^{20, 45}_0 ∨ false 
c  in DIMACS:
-13688 -13689 -13690  0

c i = 46
c  -2+1 --> -1
c    ( b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧  p_920) -> ( b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0)
c  in CNF:
c    -b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨  b^{20, 47}_2
c    -b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_1
c    -b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨  b^{20, 47}_0
c  in DIMACS:
-13691 -13692  13693 -920  13694 0
-13691 -13692  13693 -920 -13695 0
-13691 -13692  13693 -920  13696 0

c  -1+1 --> 0
c    ( b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0 ∧  p_920) -> (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧ -b^{20, 47}_0)
c  in CNF:
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_2
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_1
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_0
c  in DIMACS:
-13691  13692 -13693 -920 -13694 0
-13691  13692 -13693 -920 -13695 0
-13691  13692 -13693 -920 -13696 0

c  0+1 --> 1
c    (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧  p_920) -> (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0)
c  in CNF:
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_2
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_1
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨  b^{20, 47}_0
c  in DIMACS:
 13691  13692  13693 -920 -13694 0
 13691  13692  13693 -920 -13695 0
 13691  13692  13693 -920  13696 0

c  1+1 --> 2
c    (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0 ∧  p_920) -> (-b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0)
c  in CNF:
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_2
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨  b^{20, 47}_1
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ -p_920 ∨ -b^{20, 47}_0
c  in DIMACS:
 13691  13692 -13693 -920 -13694 0
 13691  13692 -13693 -920  13695 0
 13691  13692 -13693 -920 -13696 0

c  2+1 --> break 
c    (-b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧  p_920) -> break
c  in CNF:
c     b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 13691 -13692  13693 -920 1162 0


c  2-1 --> 1
c    (-b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧ -p_920) -> (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0)
c  in CNF:
c     b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_2
c     b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_1
c     b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨  b^{20, 47}_0
c  in DIMACS:
 13691 -13692  13693  920 -13694 0
 13691 -13692  13693  920 -13695 0
 13691 -13692  13693  920  13696 0

c  1-1 --> 0
c    (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0 ∧ -p_920) -> (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧ -b^{20, 47}_0)
c  in CNF:
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_2
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_1
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_0
c  in DIMACS:
 13691  13692 -13693  920 -13694 0
 13691  13692 -13693  920 -13695 0
 13691  13692 -13693  920 -13696 0

c  0-1 --> -1
c    (-b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧ -p_920) -> ( b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0)
c  in CNF:
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨  b^{20, 47}_2
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_1
c     b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨  b^{20, 47}_0
c  in DIMACS:
 13691  13692  13693  920  13694 0
 13691  13692  13693  920 -13695 0
 13691  13692  13693  920  13696 0

c  -1-1 --> -2
c    ( b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧  b^{20, 46}_0 ∧ -p_920) -> ( b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0)
c  in CNF:
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨  b^{20, 47}_2
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨  b^{20, 47}_1
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨  p_920 ∨ -b^{20, 47}_0
c  in DIMACS:
-13691  13692 -13693  920  13694 0
-13691  13692 -13693  920  13695 0
-13691  13692 -13693  920 -13696 0

c  -2-1 --> break 
c    ( b^{20, 46}_2 ∧  b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨  b^{20, 46}_0 ∨  p_920 ∨ break
c  in DIMACS:
-13691 -13692  13693  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 46}_2 ∧ -b^{20, 46}_1 ∧ -b^{20, 46}_0 ∧ true) 
c  in CNF:
c    -b^{20, 46}_2 ∨  b^{20, 46}_1 ∨  b^{20, 46}_0 ∨ false 
c  in DIMACS:
-13691  13692  13693  0

c  3 does not represent an automaton state.
c    -(-b^{20, 46}_2 ∧  b^{20, 46}_1 ∧  b^{20, 46}_0 ∧ true) 
c  in CNF:
c     b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ false 
c  in DIMACS:
 13691 -13692 -13693  0
c  -3 does not represent an automaton state.
c    -( b^{20, 46}_2 ∧  b^{20, 46}_1 ∧  b^{20, 46}_0 ∧ true) 
c  in CNF:
c    -b^{20, 46}_2 ∨ -b^{20, 46}_1 ∨ -b^{20, 46}_0 ∨ false 
c  in DIMACS:
-13691 -13692 -13693  0

c i = 47
c  -2+1 --> -1
c    ( b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧  p_940) -> ( b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0)
c  in CNF:
c    -b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨  b^{20, 48}_2
c    -b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_1
c    -b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨  b^{20, 48}_0
c  in DIMACS:
-13694 -13695  13696 -940  13697 0
-13694 -13695  13696 -940 -13698 0
-13694 -13695  13696 -940  13699 0

c  -1+1 --> 0
c    ( b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0 ∧  p_940) -> (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧ -b^{20, 48}_0)
c  in CNF:
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_2
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_1
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_0
c  in DIMACS:
-13694  13695 -13696 -940 -13697 0
-13694  13695 -13696 -940 -13698 0
-13694  13695 -13696 -940 -13699 0

c  0+1 --> 1
c    (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧  p_940) -> (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0)
c  in CNF:
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_2
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_1
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨  b^{20, 48}_0
c  in DIMACS:
 13694  13695  13696 -940 -13697 0
 13694  13695  13696 -940 -13698 0
 13694  13695  13696 -940  13699 0

c  1+1 --> 2
c    (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0 ∧  p_940) -> (-b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0)
c  in CNF:
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_2
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨  b^{20, 48}_1
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ -p_940 ∨ -b^{20, 48}_0
c  in DIMACS:
 13694  13695 -13696 -940 -13697 0
 13694  13695 -13696 -940  13698 0
 13694  13695 -13696 -940 -13699 0

c  2+1 --> break 
c    (-b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧  p_940) -> break
c  in CNF:
c     b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 13694 -13695  13696 -940 1162 0


c  2-1 --> 1
c    (-b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧ -p_940) -> (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0)
c  in CNF:
c     b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_2
c     b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_1
c     b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨  b^{20, 48}_0
c  in DIMACS:
 13694 -13695  13696  940 -13697 0
 13694 -13695  13696  940 -13698 0
 13694 -13695  13696  940  13699 0

c  1-1 --> 0
c    (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0 ∧ -p_940) -> (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧ -b^{20, 48}_0)
c  in CNF:
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_2
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_1
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_0
c  in DIMACS:
 13694  13695 -13696  940 -13697 0
 13694  13695 -13696  940 -13698 0
 13694  13695 -13696  940 -13699 0

c  0-1 --> -1
c    (-b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧ -p_940) -> ( b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0)
c  in CNF:
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨  b^{20, 48}_2
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_1
c     b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨  b^{20, 48}_0
c  in DIMACS:
 13694  13695  13696  940  13697 0
 13694  13695  13696  940 -13698 0
 13694  13695  13696  940  13699 0

c  -1-1 --> -2
c    ( b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧  b^{20, 47}_0 ∧ -p_940) -> ( b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0)
c  in CNF:
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨  b^{20, 48}_2
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨  b^{20, 48}_1
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨  p_940 ∨ -b^{20, 48}_0
c  in DIMACS:
-13694  13695 -13696  940  13697 0
-13694  13695 -13696  940  13698 0
-13694  13695 -13696  940 -13699 0

c  -2-1 --> break 
c    ( b^{20, 47}_2 ∧  b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨  b^{20, 47}_0 ∨  p_940 ∨ break
c  in DIMACS:
-13694 -13695  13696  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 47}_2 ∧ -b^{20, 47}_1 ∧ -b^{20, 47}_0 ∧ true) 
c  in CNF:
c    -b^{20, 47}_2 ∨  b^{20, 47}_1 ∨  b^{20, 47}_0 ∨ false 
c  in DIMACS:
-13694  13695  13696  0

c  3 does not represent an automaton state.
c    -(-b^{20, 47}_2 ∧  b^{20, 47}_1 ∧  b^{20, 47}_0 ∧ true) 
c  in CNF:
c     b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ false 
c  in DIMACS:
 13694 -13695 -13696  0
c  -3 does not represent an automaton state.
c    -( b^{20, 47}_2 ∧  b^{20, 47}_1 ∧  b^{20, 47}_0 ∧ true) 
c  in CNF:
c    -b^{20, 47}_2 ∨ -b^{20, 47}_1 ∨ -b^{20, 47}_0 ∨ false 
c  in DIMACS:
-13694 -13695 -13696  0

c i = 48
c  -2+1 --> -1
c    ( b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧  p_960) -> ( b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0)
c  in CNF:
c    -b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨  b^{20, 49}_2
c    -b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_1
c    -b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨  b^{20, 49}_0
c  in DIMACS:
-13697 -13698  13699 -960  13700 0
-13697 -13698  13699 -960 -13701 0
-13697 -13698  13699 -960  13702 0

c  -1+1 --> 0
c    ( b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0 ∧  p_960) -> (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧ -b^{20, 49}_0)
c  in CNF:
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_2
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_1
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_0
c  in DIMACS:
-13697  13698 -13699 -960 -13700 0
-13697  13698 -13699 -960 -13701 0
-13697  13698 -13699 -960 -13702 0

c  0+1 --> 1
c    (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧  p_960) -> (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0)
c  in CNF:
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_2
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_1
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨  b^{20, 49}_0
c  in DIMACS:
 13697  13698  13699 -960 -13700 0
 13697  13698  13699 -960 -13701 0
 13697  13698  13699 -960  13702 0

c  1+1 --> 2
c    (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0 ∧  p_960) -> (-b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0)
c  in CNF:
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_2
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨  b^{20, 49}_1
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ -p_960 ∨ -b^{20, 49}_0
c  in DIMACS:
 13697  13698 -13699 -960 -13700 0
 13697  13698 -13699 -960  13701 0
 13697  13698 -13699 -960 -13702 0

c  2+1 --> break 
c    (-b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧  p_960) -> break
c  in CNF:
c     b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 13697 -13698  13699 -960 1162 0


c  2-1 --> 1
c    (-b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧ -p_960) -> (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0)
c  in CNF:
c     b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_2
c     b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_1
c     b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨  b^{20, 49}_0
c  in DIMACS:
 13697 -13698  13699  960 -13700 0
 13697 -13698  13699  960 -13701 0
 13697 -13698  13699  960  13702 0

c  1-1 --> 0
c    (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0 ∧ -p_960) -> (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧ -b^{20, 49}_0)
c  in CNF:
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_2
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_1
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_0
c  in DIMACS:
 13697  13698 -13699  960 -13700 0
 13697  13698 -13699  960 -13701 0
 13697  13698 -13699  960 -13702 0

c  0-1 --> -1
c    (-b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧ -p_960) -> ( b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0)
c  in CNF:
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨  b^{20, 49}_2
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_1
c     b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨  b^{20, 49}_0
c  in DIMACS:
 13697  13698  13699  960  13700 0
 13697  13698  13699  960 -13701 0
 13697  13698  13699  960  13702 0

c  -1-1 --> -2
c    ( b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧  b^{20, 48}_0 ∧ -p_960) -> ( b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0)
c  in CNF:
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨  b^{20, 49}_2
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨  b^{20, 49}_1
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨  p_960 ∨ -b^{20, 49}_0
c  in DIMACS:
-13697  13698 -13699  960  13700 0
-13697  13698 -13699  960  13701 0
-13697  13698 -13699  960 -13702 0

c  -2-1 --> break 
c    ( b^{20, 48}_2 ∧  b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨  b^{20, 48}_0 ∨  p_960 ∨ break
c  in DIMACS:
-13697 -13698  13699  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 48}_2 ∧ -b^{20, 48}_1 ∧ -b^{20, 48}_0 ∧ true) 
c  in CNF:
c    -b^{20, 48}_2 ∨  b^{20, 48}_1 ∨  b^{20, 48}_0 ∨ false 
c  in DIMACS:
-13697  13698  13699  0

c  3 does not represent an automaton state.
c    -(-b^{20, 48}_2 ∧  b^{20, 48}_1 ∧  b^{20, 48}_0 ∧ true) 
c  in CNF:
c     b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ false 
c  in DIMACS:
 13697 -13698 -13699  0
c  -3 does not represent an automaton state.
c    -( b^{20, 48}_2 ∧  b^{20, 48}_1 ∧  b^{20, 48}_0 ∧ true) 
c  in CNF:
c    -b^{20, 48}_2 ∨ -b^{20, 48}_1 ∨ -b^{20, 48}_0 ∨ false 
c  in DIMACS:
-13697 -13698 -13699  0

c i = 49
c  -2+1 --> -1
c    ( b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧  p_980) -> ( b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0)
c  in CNF:
c    -b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨  b^{20, 50}_2
c    -b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_1
c    -b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨  b^{20, 50}_0
c  in DIMACS:
-13700 -13701  13702 -980  13703 0
-13700 -13701  13702 -980 -13704 0
-13700 -13701  13702 -980  13705 0

c  -1+1 --> 0
c    ( b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0 ∧  p_980) -> (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧ -b^{20, 50}_0)
c  in CNF:
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_2
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_1
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_0
c  in DIMACS:
-13700  13701 -13702 -980 -13703 0
-13700  13701 -13702 -980 -13704 0
-13700  13701 -13702 -980 -13705 0

c  0+1 --> 1
c    (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧  p_980) -> (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0)
c  in CNF:
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_2
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_1
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨  b^{20, 50}_0
c  in DIMACS:
 13700  13701  13702 -980 -13703 0
 13700  13701  13702 -980 -13704 0
 13700  13701  13702 -980  13705 0

c  1+1 --> 2
c    (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0 ∧  p_980) -> (-b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0)
c  in CNF:
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_2
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨  b^{20, 50}_1
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ -p_980 ∨ -b^{20, 50}_0
c  in DIMACS:
 13700  13701 -13702 -980 -13703 0
 13700  13701 -13702 -980  13704 0
 13700  13701 -13702 -980 -13705 0

c  2+1 --> break 
c    (-b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧  p_980) -> break
c  in CNF:
c     b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 13700 -13701  13702 -980 1162 0


c  2-1 --> 1
c    (-b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧ -p_980) -> (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0)
c  in CNF:
c     b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_2
c     b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_1
c     b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨  b^{20, 50}_0
c  in DIMACS:
 13700 -13701  13702  980 -13703 0
 13700 -13701  13702  980 -13704 0
 13700 -13701  13702  980  13705 0

c  1-1 --> 0
c    (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0 ∧ -p_980) -> (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧ -b^{20, 50}_0)
c  in CNF:
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_2
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_1
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_0
c  in DIMACS:
 13700  13701 -13702  980 -13703 0
 13700  13701 -13702  980 -13704 0
 13700  13701 -13702  980 -13705 0

c  0-1 --> -1
c    (-b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧ -p_980) -> ( b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0)
c  in CNF:
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨  b^{20, 50}_2
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_1
c     b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨  b^{20, 50}_0
c  in DIMACS:
 13700  13701  13702  980  13703 0
 13700  13701  13702  980 -13704 0
 13700  13701  13702  980  13705 0

c  -1-1 --> -2
c    ( b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧  b^{20, 49}_0 ∧ -p_980) -> ( b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0)
c  in CNF:
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨  b^{20, 50}_2
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨  b^{20, 50}_1
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨  p_980 ∨ -b^{20, 50}_0
c  in DIMACS:
-13700  13701 -13702  980  13703 0
-13700  13701 -13702  980  13704 0
-13700  13701 -13702  980 -13705 0

c  -2-1 --> break 
c    ( b^{20, 49}_2 ∧  b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨  b^{20, 49}_0 ∨  p_980 ∨ break
c  in DIMACS:
-13700 -13701  13702  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 49}_2 ∧ -b^{20, 49}_1 ∧ -b^{20, 49}_0 ∧ true) 
c  in CNF:
c    -b^{20, 49}_2 ∨  b^{20, 49}_1 ∨  b^{20, 49}_0 ∨ false 
c  in DIMACS:
-13700  13701  13702  0

c  3 does not represent an automaton state.
c    -(-b^{20, 49}_2 ∧  b^{20, 49}_1 ∧  b^{20, 49}_0 ∧ true) 
c  in CNF:
c     b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ false 
c  in DIMACS:
 13700 -13701 -13702  0
c  -3 does not represent an automaton state.
c    -( b^{20, 49}_2 ∧  b^{20, 49}_1 ∧  b^{20, 49}_0 ∧ true) 
c  in CNF:
c    -b^{20, 49}_2 ∨ -b^{20, 49}_1 ∨ -b^{20, 49}_0 ∨ false 
c  in DIMACS:
-13700 -13701 -13702  0

c i = 50
c  -2+1 --> -1
c    ( b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧  p_1000) -> ( b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0)
c  in CNF:
c    -b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨  b^{20, 51}_2
c    -b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_1
c    -b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨  b^{20, 51}_0
c  in DIMACS:
-13703 -13704  13705 -1000  13706 0
-13703 -13704  13705 -1000 -13707 0
-13703 -13704  13705 -1000  13708 0

c  -1+1 --> 0
c    ( b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0 ∧  p_1000) -> (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧ -b^{20, 51}_0)
c  in CNF:
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_2
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_1
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_0
c  in DIMACS:
-13703  13704 -13705 -1000 -13706 0
-13703  13704 -13705 -1000 -13707 0
-13703  13704 -13705 -1000 -13708 0

c  0+1 --> 1
c    (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧  p_1000) -> (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0)
c  in CNF:
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_2
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_1
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨  b^{20, 51}_0
c  in DIMACS:
 13703  13704  13705 -1000 -13706 0
 13703  13704  13705 -1000 -13707 0
 13703  13704  13705 -1000  13708 0

c  1+1 --> 2
c    (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0 ∧  p_1000) -> (-b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0)
c  in CNF:
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_2
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨  b^{20, 51}_1
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ -p_1000 ∨ -b^{20, 51}_0
c  in DIMACS:
 13703  13704 -13705 -1000 -13706 0
 13703  13704 -13705 -1000  13707 0
 13703  13704 -13705 -1000 -13708 0

c  2+1 --> break 
c    (-b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 13703 -13704  13705 -1000 1162 0


c  2-1 --> 1
c    (-b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧ -p_1000) -> (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0)
c  in CNF:
c     b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_2
c     b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_1
c     b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨  b^{20, 51}_0
c  in DIMACS:
 13703 -13704  13705  1000 -13706 0
 13703 -13704  13705  1000 -13707 0
 13703 -13704  13705  1000  13708 0

c  1-1 --> 0
c    (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0 ∧ -p_1000) -> (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧ -b^{20, 51}_0)
c  in CNF:
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_2
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_1
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_0
c  in DIMACS:
 13703  13704 -13705  1000 -13706 0
 13703  13704 -13705  1000 -13707 0
 13703  13704 -13705  1000 -13708 0

c  0-1 --> -1
c    (-b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧ -p_1000) -> ( b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0)
c  in CNF:
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨  b^{20, 51}_2
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_1
c     b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨  b^{20, 51}_0
c  in DIMACS:
 13703  13704  13705  1000  13706 0
 13703  13704  13705  1000 -13707 0
 13703  13704  13705  1000  13708 0

c  -1-1 --> -2
c    ( b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧  b^{20, 50}_0 ∧ -p_1000) -> ( b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0)
c  in CNF:
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨  b^{20, 51}_2
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨  b^{20, 51}_1
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨  p_1000 ∨ -b^{20, 51}_0
c  in DIMACS:
-13703  13704 -13705  1000  13706 0
-13703  13704 -13705  1000  13707 0
-13703  13704 -13705  1000 -13708 0

c  -2-1 --> break 
c    ( b^{20, 50}_2 ∧  b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨  b^{20, 50}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-13703 -13704  13705  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 50}_2 ∧ -b^{20, 50}_1 ∧ -b^{20, 50}_0 ∧ true) 
c  in CNF:
c    -b^{20, 50}_2 ∨  b^{20, 50}_1 ∨  b^{20, 50}_0 ∨ false 
c  in DIMACS:
-13703  13704  13705  0

c  3 does not represent an automaton state.
c    -(-b^{20, 50}_2 ∧  b^{20, 50}_1 ∧  b^{20, 50}_0 ∧ true) 
c  in CNF:
c     b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ false 
c  in DIMACS:
 13703 -13704 -13705  0
c  -3 does not represent an automaton state.
c    -( b^{20, 50}_2 ∧  b^{20, 50}_1 ∧  b^{20, 50}_0 ∧ true) 
c  in CNF:
c    -b^{20, 50}_2 ∨ -b^{20, 50}_1 ∨ -b^{20, 50}_0 ∨ false 
c  in DIMACS:
-13703 -13704 -13705  0

c i = 51
c  -2+1 --> -1
c    ( b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧  p_1020) -> ( b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0)
c  in CNF:
c    -b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨  b^{20, 52}_2
c    -b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_1
c    -b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨  b^{20, 52}_0
c  in DIMACS:
-13706 -13707  13708 -1020  13709 0
-13706 -13707  13708 -1020 -13710 0
-13706 -13707  13708 -1020  13711 0

c  -1+1 --> 0
c    ( b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0 ∧  p_1020) -> (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧ -b^{20, 52}_0)
c  in CNF:
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_2
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_1
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_0
c  in DIMACS:
-13706  13707 -13708 -1020 -13709 0
-13706  13707 -13708 -1020 -13710 0
-13706  13707 -13708 -1020 -13711 0

c  0+1 --> 1
c    (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧  p_1020) -> (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0)
c  in CNF:
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_2
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_1
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨  b^{20, 52}_0
c  in DIMACS:
 13706  13707  13708 -1020 -13709 0
 13706  13707  13708 -1020 -13710 0
 13706  13707  13708 -1020  13711 0

c  1+1 --> 2
c    (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0 ∧  p_1020) -> (-b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0)
c  in CNF:
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_2
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨  b^{20, 52}_1
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ -p_1020 ∨ -b^{20, 52}_0
c  in DIMACS:
 13706  13707 -13708 -1020 -13709 0
 13706  13707 -13708 -1020  13710 0
 13706  13707 -13708 -1020 -13711 0

c  2+1 --> break 
c    (-b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 13706 -13707  13708 -1020 1162 0


c  2-1 --> 1
c    (-b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧ -p_1020) -> (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0)
c  in CNF:
c     b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_2
c     b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_1
c     b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨  b^{20, 52}_0
c  in DIMACS:
 13706 -13707  13708  1020 -13709 0
 13706 -13707  13708  1020 -13710 0
 13706 -13707  13708  1020  13711 0

c  1-1 --> 0
c    (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0 ∧ -p_1020) -> (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧ -b^{20, 52}_0)
c  in CNF:
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_2
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_1
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_0
c  in DIMACS:
 13706  13707 -13708  1020 -13709 0
 13706  13707 -13708  1020 -13710 0
 13706  13707 -13708  1020 -13711 0

c  0-1 --> -1
c    (-b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧ -p_1020) -> ( b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0)
c  in CNF:
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨  b^{20, 52}_2
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_1
c     b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨  b^{20, 52}_0
c  in DIMACS:
 13706  13707  13708  1020  13709 0
 13706  13707  13708  1020 -13710 0
 13706  13707  13708  1020  13711 0

c  -1-1 --> -2
c    ( b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧  b^{20, 51}_0 ∧ -p_1020) -> ( b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0)
c  in CNF:
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨  b^{20, 52}_2
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨  b^{20, 52}_1
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨  p_1020 ∨ -b^{20, 52}_0
c  in DIMACS:
-13706  13707 -13708  1020  13709 0
-13706  13707 -13708  1020  13710 0
-13706  13707 -13708  1020 -13711 0

c  -2-1 --> break 
c    ( b^{20, 51}_2 ∧  b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨  b^{20, 51}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-13706 -13707  13708  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 51}_2 ∧ -b^{20, 51}_1 ∧ -b^{20, 51}_0 ∧ true) 
c  in CNF:
c    -b^{20, 51}_2 ∨  b^{20, 51}_1 ∨  b^{20, 51}_0 ∨ false 
c  in DIMACS:
-13706  13707  13708  0

c  3 does not represent an automaton state.
c    -(-b^{20, 51}_2 ∧  b^{20, 51}_1 ∧  b^{20, 51}_0 ∧ true) 
c  in CNF:
c     b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ false 
c  in DIMACS:
 13706 -13707 -13708  0
c  -3 does not represent an automaton state.
c    -( b^{20, 51}_2 ∧  b^{20, 51}_1 ∧  b^{20, 51}_0 ∧ true) 
c  in CNF:
c    -b^{20, 51}_2 ∨ -b^{20, 51}_1 ∨ -b^{20, 51}_0 ∨ false 
c  in DIMACS:
-13706 -13707 -13708  0

c i = 52
c  -2+1 --> -1
c    ( b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧  p_1040) -> ( b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0)
c  in CNF:
c    -b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨  b^{20, 53}_2
c    -b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_1
c    -b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨  b^{20, 53}_0
c  in DIMACS:
-13709 -13710  13711 -1040  13712 0
-13709 -13710  13711 -1040 -13713 0
-13709 -13710  13711 -1040  13714 0

c  -1+1 --> 0
c    ( b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0 ∧  p_1040) -> (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧ -b^{20, 53}_0)
c  in CNF:
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_2
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_1
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_0
c  in DIMACS:
-13709  13710 -13711 -1040 -13712 0
-13709  13710 -13711 -1040 -13713 0
-13709  13710 -13711 -1040 -13714 0

c  0+1 --> 1
c    (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧  p_1040) -> (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0)
c  in CNF:
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_2
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_1
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨  b^{20, 53}_0
c  in DIMACS:
 13709  13710  13711 -1040 -13712 0
 13709  13710  13711 -1040 -13713 0
 13709  13710  13711 -1040  13714 0

c  1+1 --> 2
c    (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0 ∧  p_1040) -> (-b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0)
c  in CNF:
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_2
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨  b^{20, 53}_1
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ -p_1040 ∨ -b^{20, 53}_0
c  in DIMACS:
 13709  13710 -13711 -1040 -13712 0
 13709  13710 -13711 -1040  13713 0
 13709  13710 -13711 -1040 -13714 0

c  2+1 --> break 
c    (-b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 13709 -13710  13711 -1040 1162 0


c  2-1 --> 1
c    (-b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧ -p_1040) -> (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0)
c  in CNF:
c     b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_2
c     b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_1
c     b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨  b^{20, 53}_0
c  in DIMACS:
 13709 -13710  13711  1040 -13712 0
 13709 -13710  13711  1040 -13713 0
 13709 -13710  13711  1040  13714 0

c  1-1 --> 0
c    (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0 ∧ -p_1040) -> (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧ -b^{20, 53}_0)
c  in CNF:
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_2
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_1
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_0
c  in DIMACS:
 13709  13710 -13711  1040 -13712 0
 13709  13710 -13711  1040 -13713 0
 13709  13710 -13711  1040 -13714 0

c  0-1 --> -1
c    (-b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧ -p_1040) -> ( b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0)
c  in CNF:
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨  b^{20, 53}_2
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_1
c     b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨  b^{20, 53}_0
c  in DIMACS:
 13709  13710  13711  1040  13712 0
 13709  13710  13711  1040 -13713 0
 13709  13710  13711  1040  13714 0

c  -1-1 --> -2
c    ( b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧  b^{20, 52}_0 ∧ -p_1040) -> ( b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0)
c  in CNF:
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨  b^{20, 53}_2
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨  b^{20, 53}_1
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨  p_1040 ∨ -b^{20, 53}_0
c  in DIMACS:
-13709  13710 -13711  1040  13712 0
-13709  13710 -13711  1040  13713 0
-13709  13710 -13711  1040 -13714 0

c  -2-1 --> break 
c    ( b^{20, 52}_2 ∧  b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨  b^{20, 52}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-13709 -13710  13711  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 52}_2 ∧ -b^{20, 52}_1 ∧ -b^{20, 52}_0 ∧ true) 
c  in CNF:
c    -b^{20, 52}_2 ∨  b^{20, 52}_1 ∨  b^{20, 52}_0 ∨ false 
c  in DIMACS:
-13709  13710  13711  0

c  3 does not represent an automaton state.
c    -(-b^{20, 52}_2 ∧  b^{20, 52}_1 ∧  b^{20, 52}_0 ∧ true) 
c  in CNF:
c     b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ false 
c  in DIMACS:
 13709 -13710 -13711  0
c  -3 does not represent an automaton state.
c    -( b^{20, 52}_2 ∧  b^{20, 52}_1 ∧  b^{20, 52}_0 ∧ true) 
c  in CNF:
c    -b^{20, 52}_2 ∨ -b^{20, 52}_1 ∨ -b^{20, 52}_0 ∨ false 
c  in DIMACS:
-13709 -13710 -13711  0

c i = 53
c  -2+1 --> -1
c    ( b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧  p_1060) -> ( b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0)
c  in CNF:
c    -b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨  b^{20, 54}_2
c    -b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_1
c    -b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨  b^{20, 54}_0
c  in DIMACS:
-13712 -13713  13714 -1060  13715 0
-13712 -13713  13714 -1060 -13716 0
-13712 -13713  13714 -1060  13717 0

c  -1+1 --> 0
c    ( b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0 ∧  p_1060) -> (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧ -b^{20, 54}_0)
c  in CNF:
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_2
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_1
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_0
c  in DIMACS:
-13712  13713 -13714 -1060 -13715 0
-13712  13713 -13714 -1060 -13716 0
-13712  13713 -13714 -1060 -13717 0

c  0+1 --> 1
c    (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧  p_1060) -> (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0)
c  in CNF:
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_2
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_1
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨  b^{20, 54}_0
c  in DIMACS:
 13712  13713  13714 -1060 -13715 0
 13712  13713  13714 -1060 -13716 0
 13712  13713  13714 -1060  13717 0

c  1+1 --> 2
c    (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0 ∧  p_1060) -> (-b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0)
c  in CNF:
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_2
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨  b^{20, 54}_1
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ -p_1060 ∨ -b^{20, 54}_0
c  in DIMACS:
 13712  13713 -13714 -1060 -13715 0
 13712  13713 -13714 -1060  13716 0
 13712  13713 -13714 -1060 -13717 0

c  2+1 --> break 
c    (-b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 13712 -13713  13714 -1060 1162 0


c  2-1 --> 1
c    (-b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧ -p_1060) -> (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0)
c  in CNF:
c     b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_2
c     b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_1
c     b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨  b^{20, 54}_0
c  in DIMACS:
 13712 -13713  13714  1060 -13715 0
 13712 -13713  13714  1060 -13716 0
 13712 -13713  13714  1060  13717 0

c  1-1 --> 0
c    (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0 ∧ -p_1060) -> (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧ -b^{20, 54}_0)
c  in CNF:
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_2
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_1
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_0
c  in DIMACS:
 13712  13713 -13714  1060 -13715 0
 13712  13713 -13714  1060 -13716 0
 13712  13713 -13714  1060 -13717 0

c  0-1 --> -1
c    (-b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧ -p_1060) -> ( b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0)
c  in CNF:
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨  b^{20, 54}_2
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_1
c     b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨  b^{20, 54}_0
c  in DIMACS:
 13712  13713  13714  1060  13715 0
 13712  13713  13714  1060 -13716 0
 13712  13713  13714  1060  13717 0

c  -1-1 --> -2
c    ( b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧  b^{20, 53}_0 ∧ -p_1060) -> ( b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0)
c  in CNF:
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨  b^{20, 54}_2
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨  b^{20, 54}_1
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨  p_1060 ∨ -b^{20, 54}_0
c  in DIMACS:
-13712  13713 -13714  1060  13715 0
-13712  13713 -13714  1060  13716 0
-13712  13713 -13714  1060 -13717 0

c  -2-1 --> break 
c    ( b^{20, 53}_2 ∧  b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨  b^{20, 53}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-13712 -13713  13714  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 53}_2 ∧ -b^{20, 53}_1 ∧ -b^{20, 53}_0 ∧ true) 
c  in CNF:
c    -b^{20, 53}_2 ∨  b^{20, 53}_1 ∨  b^{20, 53}_0 ∨ false 
c  in DIMACS:
-13712  13713  13714  0

c  3 does not represent an automaton state.
c    -(-b^{20, 53}_2 ∧  b^{20, 53}_1 ∧  b^{20, 53}_0 ∧ true) 
c  in CNF:
c     b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ false 
c  in DIMACS:
 13712 -13713 -13714  0
c  -3 does not represent an automaton state.
c    -( b^{20, 53}_2 ∧  b^{20, 53}_1 ∧  b^{20, 53}_0 ∧ true) 
c  in CNF:
c    -b^{20, 53}_2 ∨ -b^{20, 53}_1 ∨ -b^{20, 53}_0 ∨ false 
c  in DIMACS:
-13712 -13713 -13714  0

c i = 54
c  -2+1 --> -1
c    ( b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧  p_1080) -> ( b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0)
c  in CNF:
c    -b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨  b^{20, 55}_2
c    -b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_1
c    -b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨  b^{20, 55}_0
c  in DIMACS:
-13715 -13716  13717 -1080  13718 0
-13715 -13716  13717 -1080 -13719 0
-13715 -13716  13717 -1080  13720 0

c  -1+1 --> 0
c    ( b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0 ∧  p_1080) -> (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧ -b^{20, 55}_0)
c  in CNF:
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_2
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_1
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_0
c  in DIMACS:
-13715  13716 -13717 -1080 -13718 0
-13715  13716 -13717 -1080 -13719 0
-13715  13716 -13717 -1080 -13720 0

c  0+1 --> 1
c    (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧  p_1080) -> (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0)
c  in CNF:
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_2
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_1
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨  b^{20, 55}_0
c  in DIMACS:
 13715  13716  13717 -1080 -13718 0
 13715  13716  13717 -1080 -13719 0
 13715  13716  13717 -1080  13720 0

c  1+1 --> 2
c    (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0 ∧  p_1080) -> (-b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0)
c  in CNF:
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_2
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨  b^{20, 55}_1
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ -p_1080 ∨ -b^{20, 55}_0
c  in DIMACS:
 13715  13716 -13717 -1080 -13718 0
 13715  13716 -13717 -1080  13719 0
 13715  13716 -13717 -1080 -13720 0

c  2+1 --> break 
c    (-b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 13715 -13716  13717 -1080 1162 0


c  2-1 --> 1
c    (-b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧ -p_1080) -> (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0)
c  in CNF:
c     b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_2
c     b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_1
c     b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨  b^{20, 55}_0
c  in DIMACS:
 13715 -13716  13717  1080 -13718 0
 13715 -13716  13717  1080 -13719 0
 13715 -13716  13717  1080  13720 0

c  1-1 --> 0
c    (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0 ∧ -p_1080) -> (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧ -b^{20, 55}_0)
c  in CNF:
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_2
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_1
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_0
c  in DIMACS:
 13715  13716 -13717  1080 -13718 0
 13715  13716 -13717  1080 -13719 0
 13715  13716 -13717  1080 -13720 0

c  0-1 --> -1
c    (-b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧ -p_1080) -> ( b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0)
c  in CNF:
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨  b^{20, 55}_2
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_1
c     b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨  b^{20, 55}_0
c  in DIMACS:
 13715  13716  13717  1080  13718 0
 13715  13716  13717  1080 -13719 0
 13715  13716  13717  1080  13720 0

c  -1-1 --> -2
c    ( b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧  b^{20, 54}_0 ∧ -p_1080) -> ( b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0)
c  in CNF:
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨  b^{20, 55}_2
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨  b^{20, 55}_1
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨  p_1080 ∨ -b^{20, 55}_0
c  in DIMACS:
-13715  13716 -13717  1080  13718 0
-13715  13716 -13717  1080  13719 0
-13715  13716 -13717  1080 -13720 0

c  -2-1 --> break 
c    ( b^{20, 54}_2 ∧  b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨  b^{20, 54}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-13715 -13716  13717  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 54}_2 ∧ -b^{20, 54}_1 ∧ -b^{20, 54}_0 ∧ true) 
c  in CNF:
c    -b^{20, 54}_2 ∨  b^{20, 54}_1 ∨  b^{20, 54}_0 ∨ false 
c  in DIMACS:
-13715  13716  13717  0

c  3 does not represent an automaton state.
c    -(-b^{20, 54}_2 ∧  b^{20, 54}_1 ∧  b^{20, 54}_0 ∧ true) 
c  in CNF:
c     b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ false 
c  in DIMACS:
 13715 -13716 -13717  0
c  -3 does not represent an automaton state.
c    -( b^{20, 54}_2 ∧  b^{20, 54}_1 ∧  b^{20, 54}_0 ∧ true) 
c  in CNF:
c    -b^{20, 54}_2 ∨ -b^{20, 54}_1 ∨ -b^{20, 54}_0 ∨ false 
c  in DIMACS:
-13715 -13716 -13717  0

c i = 55
c  -2+1 --> -1
c    ( b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧  p_1100) -> ( b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0)
c  in CNF:
c    -b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨  b^{20, 56}_2
c    -b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_1
c    -b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨  b^{20, 56}_0
c  in DIMACS:
-13718 -13719  13720 -1100  13721 0
-13718 -13719  13720 -1100 -13722 0
-13718 -13719  13720 -1100  13723 0

c  -1+1 --> 0
c    ( b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0 ∧  p_1100) -> (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧ -b^{20, 56}_0)
c  in CNF:
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_2
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_1
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_0
c  in DIMACS:
-13718  13719 -13720 -1100 -13721 0
-13718  13719 -13720 -1100 -13722 0
-13718  13719 -13720 -1100 -13723 0

c  0+1 --> 1
c    (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧  p_1100) -> (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0)
c  in CNF:
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_2
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_1
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨  b^{20, 56}_0
c  in DIMACS:
 13718  13719  13720 -1100 -13721 0
 13718  13719  13720 -1100 -13722 0
 13718  13719  13720 -1100  13723 0

c  1+1 --> 2
c    (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0 ∧  p_1100) -> (-b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0)
c  in CNF:
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_2
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨  b^{20, 56}_1
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ -p_1100 ∨ -b^{20, 56}_0
c  in DIMACS:
 13718  13719 -13720 -1100 -13721 0
 13718  13719 -13720 -1100  13722 0
 13718  13719 -13720 -1100 -13723 0

c  2+1 --> break 
c    (-b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 13718 -13719  13720 -1100 1162 0


c  2-1 --> 1
c    (-b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧ -p_1100) -> (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0)
c  in CNF:
c     b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_2
c     b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_1
c     b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨  b^{20, 56}_0
c  in DIMACS:
 13718 -13719  13720  1100 -13721 0
 13718 -13719  13720  1100 -13722 0
 13718 -13719  13720  1100  13723 0

c  1-1 --> 0
c    (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0 ∧ -p_1100) -> (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧ -b^{20, 56}_0)
c  in CNF:
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_2
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_1
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_0
c  in DIMACS:
 13718  13719 -13720  1100 -13721 0
 13718  13719 -13720  1100 -13722 0
 13718  13719 -13720  1100 -13723 0

c  0-1 --> -1
c    (-b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧ -p_1100) -> ( b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0)
c  in CNF:
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨  b^{20, 56}_2
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_1
c     b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨  b^{20, 56}_0
c  in DIMACS:
 13718  13719  13720  1100  13721 0
 13718  13719  13720  1100 -13722 0
 13718  13719  13720  1100  13723 0

c  -1-1 --> -2
c    ( b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧  b^{20, 55}_0 ∧ -p_1100) -> ( b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0)
c  in CNF:
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨  b^{20, 56}_2
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨  b^{20, 56}_1
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨  p_1100 ∨ -b^{20, 56}_0
c  in DIMACS:
-13718  13719 -13720  1100  13721 0
-13718  13719 -13720  1100  13722 0
-13718  13719 -13720  1100 -13723 0

c  -2-1 --> break 
c    ( b^{20, 55}_2 ∧  b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨  b^{20, 55}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-13718 -13719  13720  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 55}_2 ∧ -b^{20, 55}_1 ∧ -b^{20, 55}_0 ∧ true) 
c  in CNF:
c    -b^{20, 55}_2 ∨  b^{20, 55}_1 ∨  b^{20, 55}_0 ∨ false 
c  in DIMACS:
-13718  13719  13720  0

c  3 does not represent an automaton state.
c    -(-b^{20, 55}_2 ∧  b^{20, 55}_1 ∧  b^{20, 55}_0 ∧ true) 
c  in CNF:
c     b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ false 
c  in DIMACS:
 13718 -13719 -13720  0
c  -3 does not represent an automaton state.
c    -( b^{20, 55}_2 ∧  b^{20, 55}_1 ∧  b^{20, 55}_0 ∧ true) 
c  in CNF:
c    -b^{20, 55}_2 ∨ -b^{20, 55}_1 ∨ -b^{20, 55}_0 ∨ false 
c  in DIMACS:
-13718 -13719 -13720  0

c i = 56
c  -2+1 --> -1
c    ( b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧  p_1120) -> ( b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0)
c  in CNF:
c    -b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨  b^{20, 57}_2
c    -b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_1
c    -b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨  b^{20, 57}_0
c  in DIMACS:
-13721 -13722  13723 -1120  13724 0
-13721 -13722  13723 -1120 -13725 0
-13721 -13722  13723 -1120  13726 0

c  -1+1 --> 0
c    ( b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0 ∧  p_1120) -> (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧ -b^{20, 57}_0)
c  in CNF:
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_2
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_1
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_0
c  in DIMACS:
-13721  13722 -13723 -1120 -13724 0
-13721  13722 -13723 -1120 -13725 0
-13721  13722 -13723 -1120 -13726 0

c  0+1 --> 1
c    (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧  p_1120) -> (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0)
c  in CNF:
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_2
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_1
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨  b^{20, 57}_0
c  in DIMACS:
 13721  13722  13723 -1120 -13724 0
 13721  13722  13723 -1120 -13725 0
 13721  13722  13723 -1120  13726 0

c  1+1 --> 2
c    (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0 ∧  p_1120) -> (-b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0)
c  in CNF:
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_2
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨  b^{20, 57}_1
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ -p_1120 ∨ -b^{20, 57}_0
c  in DIMACS:
 13721  13722 -13723 -1120 -13724 0
 13721  13722 -13723 -1120  13725 0
 13721  13722 -13723 -1120 -13726 0

c  2+1 --> break 
c    (-b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 13721 -13722  13723 -1120 1162 0


c  2-1 --> 1
c    (-b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧ -p_1120) -> (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0)
c  in CNF:
c     b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_2
c     b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_1
c     b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨  b^{20, 57}_0
c  in DIMACS:
 13721 -13722  13723  1120 -13724 0
 13721 -13722  13723  1120 -13725 0
 13721 -13722  13723  1120  13726 0

c  1-1 --> 0
c    (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0 ∧ -p_1120) -> (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧ -b^{20, 57}_0)
c  in CNF:
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_2
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_1
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_0
c  in DIMACS:
 13721  13722 -13723  1120 -13724 0
 13721  13722 -13723  1120 -13725 0
 13721  13722 -13723  1120 -13726 0

c  0-1 --> -1
c    (-b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧ -p_1120) -> ( b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0)
c  in CNF:
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨  b^{20, 57}_2
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_1
c     b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨  b^{20, 57}_0
c  in DIMACS:
 13721  13722  13723  1120  13724 0
 13721  13722  13723  1120 -13725 0
 13721  13722  13723  1120  13726 0

c  -1-1 --> -2
c    ( b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧  b^{20, 56}_0 ∧ -p_1120) -> ( b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0)
c  in CNF:
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨  b^{20, 57}_2
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨  b^{20, 57}_1
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨  p_1120 ∨ -b^{20, 57}_0
c  in DIMACS:
-13721  13722 -13723  1120  13724 0
-13721  13722 -13723  1120  13725 0
-13721  13722 -13723  1120 -13726 0

c  -2-1 --> break 
c    ( b^{20, 56}_2 ∧  b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨  b^{20, 56}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-13721 -13722  13723  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 56}_2 ∧ -b^{20, 56}_1 ∧ -b^{20, 56}_0 ∧ true) 
c  in CNF:
c    -b^{20, 56}_2 ∨  b^{20, 56}_1 ∨  b^{20, 56}_0 ∨ false 
c  in DIMACS:
-13721  13722  13723  0

c  3 does not represent an automaton state.
c    -(-b^{20, 56}_2 ∧  b^{20, 56}_1 ∧  b^{20, 56}_0 ∧ true) 
c  in CNF:
c     b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ false 
c  in DIMACS:
 13721 -13722 -13723  0
c  -3 does not represent an automaton state.
c    -( b^{20, 56}_2 ∧  b^{20, 56}_1 ∧  b^{20, 56}_0 ∧ true) 
c  in CNF:
c    -b^{20, 56}_2 ∨ -b^{20, 56}_1 ∨ -b^{20, 56}_0 ∨ false 
c  in DIMACS:
-13721 -13722 -13723  0

c i = 57
c  -2+1 --> -1
c    ( b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧  p_1140) -> ( b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0)
c  in CNF:
c    -b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨  b^{20, 58}_2
c    -b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_1
c    -b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨  b^{20, 58}_0
c  in DIMACS:
-13724 -13725  13726 -1140  13727 0
-13724 -13725  13726 -1140 -13728 0
-13724 -13725  13726 -1140  13729 0

c  -1+1 --> 0
c    ( b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0 ∧  p_1140) -> (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧ -b^{20, 58}_0)
c  in CNF:
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_2
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_1
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_0
c  in DIMACS:
-13724  13725 -13726 -1140 -13727 0
-13724  13725 -13726 -1140 -13728 0
-13724  13725 -13726 -1140 -13729 0

c  0+1 --> 1
c    (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧  p_1140) -> (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0)
c  in CNF:
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_2
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_1
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨  b^{20, 58}_0
c  in DIMACS:
 13724  13725  13726 -1140 -13727 0
 13724  13725  13726 -1140 -13728 0
 13724  13725  13726 -1140  13729 0

c  1+1 --> 2
c    (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0 ∧  p_1140) -> (-b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0)
c  in CNF:
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_2
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨  b^{20, 58}_1
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ -p_1140 ∨ -b^{20, 58}_0
c  in DIMACS:
 13724  13725 -13726 -1140 -13727 0
 13724  13725 -13726 -1140  13728 0
 13724  13725 -13726 -1140 -13729 0

c  2+1 --> break 
c    (-b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 13724 -13725  13726 -1140 1162 0


c  2-1 --> 1
c    (-b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧ -p_1140) -> (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0)
c  in CNF:
c     b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_2
c     b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_1
c     b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨  b^{20, 58}_0
c  in DIMACS:
 13724 -13725  13726  1140 -13727 0
 13724 -13725  13726  1140 -13728 0
 13724 -13725  13726  1140  13729 0

c  1-1 --> 0
c    (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0 ∧ -p_1140) -> (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧ -b^{20, 58}_0)
c  in CNF:
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_2
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_1
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_0
c  in DIMACS:
 13724  13725 -13726  1140 -13727 0
 13724  13725 -13726  1140 -13728 0
 13724  13725 -13726  1140 -13729 0

c  0-1 --> -1
c    (-b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧ -p_1140) -> ( b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0)
c  in CNF:
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨  b^{20, 58}_2
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_1
c     b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨  b^{20, 58}_0
c  in DIMACS:
 13724  13725  13726  1140  13727 0
 13724  13725  13726  1140 -13728 0
 13724  13725  13726  1140  13729 0

c  -1-1 --> -2
c    ( b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧  b^{20, 57}_0 ∧ -p_1140) -> ( b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0)
c  in CNF:
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨  b^{20, 58}_2
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨  b^{20, 58}_1
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨  p_1140 ∨ -b^{20, 58}_0
c  in DIMACS:
-13724  13725 -13726  1140  13727 0
-13724  13725 -13726  1140  13728 0
-13724  13725 -13726  1140 -13729 0

c  -2-1 --> break 
c    ( b^{20, 57}_2 ∧  b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨  b^{20, 57}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-13724 -13725  13726  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 57}_2 ∧ -b^{20, 57}_1 ∧ -b^{20, 57}_0 ∧ true) 
c  in CNF:
c    -b^{20, 57}_2 ∨  b^{20, 57}_1 ∨  b^{20, 57}_0 ∨ false 
c  in DIMACS:
-13724  13725  13726  0

c  3 does not represent an automaton state.
c    -(-b^{20, 57}_2 ∧  b^{20, 57}_1 ∧  b^{20, 57}_0 ∧ true) 
c  in CNF:
c     b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ false 
c  in DIMACS:
 13724 -13725 -13726  0
c  -3 does not represent an automaton state.
c    -( b^{20, 57}_2 ∧  b^{20, 57}_1 ∧  b^{20, 57}_0 ∧ true) 
c  in CNF:
c    -b^{20, 57}_2 ∨ -b^{20, 57}_1 ∨ -b^{20, 57}_0 ∨ false 
c  in DIMACS:
-13724 -13725 -13726  0

c i = 58
c  -2+1 --> -1
c    ( b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧  p_1160) -> ( b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧  b^{20, 59}_0)
c  in CNF:
c    -b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨  b^{20, 59}_2
c    -b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_1
c    -b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨  b^{20, 59}_0
c  in DIMACS:
-13727 -13728  13729 -1160  13730 0
-13727 -13728  13729 -1160 -13731 0
-13727 -13728  13729 -1160  13732 0

c  -1+1 --> 0
c    ( b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0 ∧  p_1160) -> (-b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧ -b^{20, 59}_0)
c  in CNF:
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_2
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_1
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_0
c  in DIMACS:
-13727  13728 -13729 -1160 -13730 0
-13727  13728 -13729 -1160 -13731 0
-13727  13728 -13729 -1160 -13732 0

c  0+1 --> 1
c    (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧  p_1160) -> (-b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧  b^{20, 59}_0)
c  in CNF:
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_2
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_1
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨  b^{20, 59}_0
c  in DIMACS:
 13727  13728  13729 -1160 -13730 0
 13727  13728  13729 -1160 -13731 0
 13727  13728  13729 -1160  13732 0

c  1+1 --> 2
c    (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0 ∧  p_1160) -> (-b^{20, 59}_2 ∧  b^{20, 59}_1 ∧ -b^{20, 59}_0)
c  in CNF:
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_2
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨  b^{20, 59}_1
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ -p_1160 ∨ -b^{20, 59}_0
c  in DIMACS:
 13727  13728 -13729 -1160 -13730 0
 13727  13728 -13729 -1160  13731 0
 13727  13728 -13729 -1160 -13732 0

c  2+1 --> break 
c    (-b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 13727 -13728  13729 -1160 1162 0


c  2-1 --> 1
c    (-b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧ -p_1160) -> (-b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧  b^{20, 59}_0)
c  in CNF:
c     b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_2
c     b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_1
c     b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨  b^{20, 59}_0
c  in DIMACS:
 13727 -13728  13729  1160 -13730 0
 13727 -13728  13729  1160 -13731 0
 13727 -13728  13729  1160  13732 0

c  1-1 --> 0
c    (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0 ∧ -p_1160) -> (-b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧ -b^{20, 59}_0)
c  in CNF:
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_2
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_1
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_0
c  in DIMACS:
 13727  13728 -13729  1160 -13730 0
 13727  13728 -13729  1160 -13731 0
 13727  13728 -13729  1160 -13732 0

c  0-1 --> -1
c    (-b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧ -p_1160) -> ( b^{20, 59}_2 ∧ -b^{20, 59}_1 ∧  b^{20, 59}_0)
c  in CNF:
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨  b^{20, 59}_2
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_1
c     b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨  b^{20, 59}_0
c  in DIMACS:
 13727  13728  13729  1160  13730 0
 13727  13728  13729  1160 -13731 0
 13727  13728  13729  1160  13732 0

c  -1-1 --> -2
c    ( b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧  b^{20, 58}_0 ∧ -p_1160) -> ( b^{20, 59}_2 ∧  b^{20, 59}_1 ∧ -b^{20, 59}_0)
c  in CNF:
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨  b^{20, 59}_2
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨  b^{20, 59}_1
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨  p_1160 ∨ -b^{20, 59}_0
c  in DIMACS:
-13727  13728 -13729  1160  13730 0
-13727  13728 -13729  1160  13731 0
-13727  13728 -13729  1160 -13732 0

c  -2-1 --> break 
c    ( b^{20, 58}_2 ∧  b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨  b^{20, 58}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-13727 -13728  13729  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{20, 58}_2 ∧ -b^{20, 58}_1 ∧ -b^{20, 58}_0 ∧ true) 
c  in CNF:
c    -b^{20, 58}_2 ∨  b^{20, 58}_1 ∨  b^{20, 58}_0 ∨ false 
c  in DIMACS:
-13727  13728  13729  0

c  3 does not represent an automaton state.
c    -(-b^{20, 58}_2 ∧  b^{20, 58}_1 ∧  b^{20, 58}_0 ∧ true) 
c  in CNF:
c     b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ false 
c  in DIMACS:
 13727 -13728 -13729  0
c  -3 does not represent an automaton state.
c    -( b^{20, 58}_2 ∧  b^{20, 58}_1 ∧  b^{20, 58}_0 ∧ true) 
c  in CNF:
c    -b^{20, 58}_2 ∨ -b^{20, 58}_1 ∨ -b^{20, 58}_0 ∨ false 
c  in DIMACS:
-13727 -13728 -13729  0

c INIT for k = 21
c    -b^{21, 1}_2
c    -b^{21, 1}_1
c    -b^{21, 1}_0
c  in DIMACS:
-13733 0
-13734 0
-13735 0

c Transitions for k = 21
c i = 1
c  -2+1 --> -1
c    ( b^{21, 1}_2 ∧  b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧  p_21) -> ( b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0)
c  in CNF:
c    -b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨  b^{21, 2}_2
c    -b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_1
c    -b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨  b^{21, 2}_0
c  in DIMACS:
-13733 -13734  13735 -21  13736 0
-13733 -13734  13735 -21 -13737 0
-13733 -13734  13735 -21  13738 0

c  -1+1 --> 0
c    ( b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧  b^{21, 1}_0 ∧  p_21) -> (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧ -b^{21, 2}_0)
c  in CNF:
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_2
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_1
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_0
c  in DIMACS:
-13733  13734 -13735 -21 -13736 0
-13733  13734 -13735 -21 -13737 0
-13733  13734 -13735 -21 -13738 0

c  0+1 --> 1
c    (-b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧  p_21) -> (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0)
c  in CNF:
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_2
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_1
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨  b^{21, 2}_0
c  in DIMACS:
 13733  13734  13735 -21 -13736 0
 13733  13734  13735 -21 -13737 0
 13733  13734  13735 -21  13738 0

c  1+1 --> 2
c    (-b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧  b^{21, 1}_0 ∧  p_21) -> (-b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0)
c  in CNF:
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_2
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨  b^{21, 2}_1
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ -p_21 ∨ -b^{21, 2}_0
c  in DIMACS:
 13733  13734 -13735 -21 -13736 0
 13733  13734 -13735 -21  13737 0
 13733  13734 -13735 -21 -13738 0

c  2+1 --> break 
c    (-b^{21, 1}_2 ∧  b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧  p_21) -> break
c  in CNF:
c     b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ -p_21 ∨ break
c  in DIMACS:
 13733 -13734  13735 -21 1162 0


c  2-1 --> 1
c    (-b^{21, 1}_2 ∧  b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧ -p_21) -> (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0)
c  in CNF:
c     b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_2
c     b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_1
c     b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨  b^{21, 2}_0
c  in DIMACS:
 13733 -13734  13735  21 -13736 0
 13733 -13734  13735  21 -13737 0
 13733 -13734  13735  21  13738 0

c  1-1 --> 0
c    (-b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧  b^{21, 1}_0 ∧ -p_21) -> (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧ -b^{21, 2}_0)
c  in CNF:
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_2
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_1
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_0
c  in DIMACS:
 13733  13734 -13735  21 -13736 0
 13733  13734 -13735  21 -13737 0
 13733  13734 -13735  21 -13738 0

c  0-1 --> -1
c    (-b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧ -p_21) -> ( b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0)
c  in CNF:
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨  b^{21, 2}_2
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_1
c     b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨  b^{21, 2}_0
c  in DIMACS:
 13733  13734  13735  21  13736 0
 13733  13734  13735  21 -13737 0
 13733  13734  13735  21  13738 0

c  -1-1 --> -2
c    ( b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧  b^{21, 1}_0 ∧ -p_21) -> ( b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0)
c  in CNF:
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨  b^{21, 2}_2
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨  b^{21, 2}_1
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨  p_21 ∨ -b^{21, 2}_0
c  in DIMACS:
-13733  13734 -13735  21  13736 0
-13733  13734 -13735  21  13737 0
-13733  13734 -13735  21 -13738 0

c  -2-1 --> break 
c    ( b^{21, 1}_2 ∧  b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧ -p_21) -> break
c  in CNF:
c    -b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨  b^{21, 1}_0 ∨  p_21 ∨ break
c  in DIMACS:
-13733 -13734  13735  21 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 1}_2 ∧ -b^{21, 1}_1 ∧ -b^{21, 1}_0 ∧ true) 
c  in CNF:
c    -b^{21, 1}_2 ∨  b^{21, 1}_1 ∨  b^{21, 1}_0 ∨ false 
c  in DIMACS:
-13733  13734  13735  0

c  3 does not represent an automaton state.
c    -(-b^{21, 1}_2 ∧  b^{21, 1}_1 ∧  b^{21, 1}_0 ∧ true) 
c  in CNF:
c     b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ false 
c  in DIMACS:
 13733 -13734 -13735  0
c  -3 does not represent an automaton state.
c    -( b^{21, 1}_2 ∧  b^{21, 1}_1 ∧  b^{21, 1}_0 ∧ true) 
c  in CNF:
c    -b^{21, 1}_2 ∨ -b^{21, 1}_1 ∨ -b^{21, 1}_0 ∨ false 
c  in DIMACS:
-13733 -13734 -13735  0

c i = 2
c  -2+1 --> -1
c    ( b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧  p_42) -> ( b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0)
c  in CNF:
c    -b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨  b^{21, 3}_2
c    -b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_1
c    -b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨  b^{21, 3}_0
c  in DIMACS:
-13736 -13737  13738 -42  13739 0
-13736 -13737  13738 -42 -13740 0
-13736 -13737  13738 -42  13741 0

c  -1+1 --> 0
c    ( b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0 ∧  p_42) -> (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧ -b^{21, 3}_0)
c  in CNF:
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_2
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_1
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_0
c  in DIMACS:
-13736  13737 -13738 -42 -13739 0
-13736  13737 -13738 -42 -13740 0
-13736  13737 -13738 -42 -13741 0

c  0+1 --> 1
c    (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧  p_42) -> (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0)
c  in CNF:
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_2
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_1
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨  b^{21, 3}_0
c  in DIMACS:
 13736  13737  13738 -42 -13739 0
 13736  13737  13738 -42 -13740 0
 13736  13737  13738 -42  13741 0

c  1+1 --> 2
c    (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0 ∧  p_42) -> (-b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0)
c  in CNF:
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_2
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨  b^{21, 3}_1
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ -p_42 ∨ -b^{21, 3}_0
c  in DIMACS:
 13736  13737 -13738 -42 -13739 0
 13736  13737 -13738 -42  13740 0
 13736  13737 -13738 -42 -13741 0

c  2+1 --> break 
c    (-b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧  p_42) -> break
c  in CNF:
c     b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 13736 -13737  13738 -42 1162 0


c  2-1 --> 1
c    (-b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧ -p_42) -> (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0)
c  in CNF:
c     b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_2
c     b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_1
c     b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨  b^{21, 3}_0
c  in DIMACS:
 13736 -13737  13738  42 -13739 0
 13736 -13737  13738  42 -13740 0
 13736 -13737  13738  42  13741 0

c  1-1 --> 0
c    (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0 ∧ -p_42) -> (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧ -b^{21, 3}_0)
c  in CNF:
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_2
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_1
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_0
c  in DIMACS:
 13736  13737 -13738  42 -13739 0
 13736  13737 -13738  42 -13740 0
 13736  13737 -13738  42 -13741 0

c  0-1 --> -1
c    (-b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧ -p_42) -> ( b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0)
c  in CNF:
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨  b^{21, 3}_2
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_1
c     b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨  b^{21, 3}_0
c  in DIMACS:
 13736  13737  13738  42  13739 0
 13736  13737  13738  42 -13740 0
 13736  13737  13738  42  13741 0

c  -1-1 --> -2
c    ( b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧  b^{21, 2}_0 ∧ -p_42) -> ( b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0)
c  in CNF:
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨  b^{21, 3}_2
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨  b^{21, 3}_1
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨  p_42 ∨ -b^{21, 3}_0
c  in DIMACS:
-13736  13737 -13738  42  13739 0
-13736  13737 -13738  42  13740 0
-13736  13737 -13738  42 -13741 0

c  -2-1 --> break 
c    ( b^{21, 2}_2 ∧  b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨  b^{21, 2}_0 ∨  p_42 ∨ break
c  in DIMACS:
-13736 -13737  13738  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 2}_2 ∧ -b^{21, 2}_1 ∧ -b^{21, 2}_0 ∧ true) 
c  in CNF:
c    -b^{21, 2}_2 ∨  b^{21, 2}_1 ∨  b^{21, 2}_0 ∨ false 
c  in DIMACS:
-13736  13737  13738  0

c  3 does not represent an automaton state.
c    -(-b^{21, 2}_2 ∧  b^{21, 2}_1 ∧  b^{21, 2}_0 ∧ true) 
c  in CNF:
c     b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ false 
c  in DIMACS:
 13736 -13737 -13738  0
c  -3 does not represent an automaton state.
c    -( b^{21, 2}_2 ∧  b^{21, 2}_1 ∧  b^{21, 2}_0 ∧ true) 
c  in CNF:
c    -b^{21, 2}_2 ∨ -b^{21, 2}_1 ∨ -b^{21, 2}_0 ∨ false 
c  in DIMACS:
-13736 -13737 -13738  0

c i = 3
c  -2+1 --> -1
c    ( b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧  p_63) -> ( b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0)
c  in CNF:
c    -b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨  b^{21, 4}_2
c    -b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_1
c    -b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨  b^{21, 4}_0
c  in DIMACS:
-13739 -13740  13741 -63  13742 0
-13739 -13740  13741 -63 -13743 0
-13739 -13740  13741 -63  13744 0

c  -1+1 --> 0
c    ( b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0 ∧  p_63) -> (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧ -b^{21, 4}_0)
c  in CNF:
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_2
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_1
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_0
c  in DIMACS:
-13739  13740 -13741 -63 -13742 0
-13739  13740 -13741 -63 -13743 0
-13739  13740 -13741 -63 -13744 0

c  0+1 --> 1
c    (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧  p_63) -> (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0)
c  in CNF:
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_2
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_1
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨  b^{21, 4}_0
c  in DIMACS:
 13739  13740  13741 -63 -13742 0
 13739  13740  13741 -63 -13743 0
 13739  13740  13741 -63  13744 0

c  1+1 --> 2
c    (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0 ∧  p_63) -> (-b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0)
c  in CNF:
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_2
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨  b^{21, 4}_1
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ -p_63 ∨ -b^{21, 4}_0
c  in DIMACS:
 13739  13740 -13741 -63 -13742 0
 13739  13740 -13741 -63  13743 0
 13739  13740 -13741 -63 -13744 0

c  2+1 --> break 
c    (-b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧  p_63) -> break
c  in CNF:
c     b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 13739 -13740  13741 -63 1162 0


c  2-1 --> 1
c    (-b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧ -p_63) -> (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0)
c  in CNF:
c     b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_2
c     b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_1
c     b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨  b^{21, 4}_0
c  in DIMACS:
 13739 -13740  13741  63 -13742 0
 13739 -13740  13741  63 -13743 0
 13739 -13740  13741  63  13744 0

c  1-1 --> 0
c    (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0 ∧ -p_63) -> (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧ -b^{21, 4}_0)
c  in CNF:
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_2
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_1
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_0
c  in DIMACS:
 13739  13740 -13741  63 -13742 0
 13739  13740 -13741  63 -13743 0
 13739  13740 -13741  63 -13744 0

c  0-1 --> -1
c    (-b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧ -p_63) -> ( b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0)
c  in CNF:
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨  b^{21, 4}_2
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_1
c     b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨  b^{21, 4}_0
c  in DIMACS:
 13739  13740  13741  63  13742 0
 13739  13740  13741  63 -13743 0
 13739  13740  13741  63  13744 0

c  -1-1 --> -2
c    ( b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧  b^{21, 3}_0 ∧ -p_63) -> ( b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0)
c  in CNF:
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨  b^{21, 4}_2
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨  b^{21, 4}_1
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨  p_63 ∨ -b^{21, 4}_0
c  in DIMACS:
-13739  13740 -13741  63  13742 0
-13739  13740 -13741  63  13743 0
-13739  13740 -13741  63 -13744 0

c  -2-1 --> break 
c    ( b^{21, 3}_2 ∧  b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨  b^{21, 3}_0 ∨  p_63 ∨ break
c  in DIMACS:
-13739 -13740  13741  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 3}_2 ∧ -b^{21, 3}_1 ∧ -b^{21, 3}_0 ∧ true) 
c  in CNF:
c    -b^{21, 3}_2 ∨  b^{21, 3}_1 ∨  b^{21, 3}_0 ∨ false 
c  in DIMACS:
-13739  13740  13741  0

c  3 does not represent an automaton state.
c    -(-b^{21, 3}_2 ∧  b^{21, 3}_1 ∧  b^{21, 3}_0 ∧ true) 
c  in CNF:
c     b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ false 
c  in DIMACS:
 13739 -13740 -13741  0
c  -3 does not represent an automaton state.
c    -( b^{21, 3}_2 ∧  b^{21, 3}_1 ∧  b^{21, 3}_0 ∧ true) 
c  in CNF:
c    -b^{21, 3}_2 ∨ -b^{21, 3}_1 ∨ -b^{21, 3}_0 ∨ false 
c  in DIMACS:
-13739 -13740 -13741  0

c i = 4
c  -2+1 --> -1
c    ( b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧  p_84) -> ( b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0)
c  in CNF:
c    -b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨  b^{21, 5}_2
c    -b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_1
c    -b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨  b^{21, 5}_0
c  in DIMACS:
-13742 -13743  13744 -84  13745 0
-13742 -13743  13744 -84 -13746 0
-13742 -13743  13744 -84  13747 0

c  -1+1 --> 0
c    ( b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0 ∧  p_84) -> (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧ -b^{21, 5}_0)
c  in CNF:
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_2
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_1
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_0
c  in DIMACS:
-13742  13743 -13744 -84 -13745 0
-13742  13743 -13744 -84 -13746 0
-13742  13743 -13744 -84 -13747 0

c  0+1 --> 1
c    (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧  p_84) -> (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0)
c  in CNF:
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_2
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_1
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨  b^{21, 5}_0
c  in DIMACS:
 13742  13743  13744 -84 -13745 0
 13742  13743  13744 -84 -13746 0
 13742  13743  13744 -84  13747 0

c  1+1 --> 2
c    (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0 ∧  p_84) -> (-b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0)
c  in CNF:
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_2
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨  b^{21, 5}_1
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ -p_84 ∨ -b^{21, 5}_0
c  in DIMACS:
 13742  13743 -13744 -84 -13745 0
 13742  13743 -13744 -84  13746 0
 13742  13743 -13744 -84 -13747 0

c  2+1 --> break 
c    (-b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧  p_84) -> break
c  in CNF:
c     b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 13742 -13743  13744 -84 1162 0


c  2-1 --> 1
c    (-b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧ -p_84) -> (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0)
c  in CNF:
c     b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_2
c     b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_1
c     b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨  b^{21, 5}_0
c  in DIMACS:
 13742 -13743  13744  84 -13745 0
 13742 -13743  13744  84 -13746 0
 13742 -13743  13744  84  13747 0

c  1-1 --> 0
c    (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0 ∧ -p_84) -> (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧ -b^{21, 5}_0)
c  in CNF:
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_2
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_1
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_0
c  in DIMACS:
 13742  13743 -13744  84 -13745 0
 13742  13743 -13744  84 -13746 0
 13742  13743 -13744  84 -13747 0

c  0-1 --> -1
c    (-b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧ -p_84) -> ( b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0)
c  in CNF:
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨  b^{21, 5}_2
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_1
c     b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨  b^{21, 5}_0
c  in DIMACS:
 13742  13743  13744  84  13745 0
 13742  13743  13744  84 -13746 0
 13742  13743  13744  84  13747 0

c  -1-1 --> -2
c    ( b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧  b^{21, 4}_0 ∧ -p_84) -> ( b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0)
c  in CNF:
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨  b^{21, 5}_2
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨  b^{21, 5}_1
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨  p_84 ∨ -b^{21, 5}_0
c  in DIMACS:
-13742  13743 -13744  84  13745 0
-13742  13743 -13744  84  13746 0
-13742  13743 -13744  84 -13747 0

c  -2-1 --> break 
c    ( b^{21, 4}_2 ∧  b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨  b^{21, 4}_0 ∨  p_84 ∨ break
c  in DIMACS:
-13742 -13743  13744  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 4}_2 ∧ -b^{21, 4}_1 ∧ -b^{21, 4}_0 ∧ true) 
c  in CNF:
c    -b^{21, 4}_2 ∨  b^{21, 4}_1 ∨  b^{21, 4}_0 ∨ false 
c  in DIMACS:
-13742  13743  13744  0

c  3 does not represent an automaton state.
c    -(-b^{21, 4}_2 ∧  b^{21, 4}_1 ∧  b^{21, 4}_0 ∧ true) 
c  in CNF:
c     b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ false 
c  in DIMACS:
 13742 -13743 -13744  0
c  -3 does not represent an automaton state.
c    -( b^{21, 4}_2 ∧  b^{21, 4}_1 ∧  b^{21, 4}_0 ∧ true) 
c  in CNF:
c    -b^{21, 4}_2 ∨ -b^{21, 4}_1 ∨ -b^{21, 4}_0 ∨ false 
c  in DIMACS:
-13742 -13743 -13744  0

c i = 5
c  -2+1 --> -1
c    ( b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧  p_105) -> ( b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0)
c  in CNF:
c    -b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨  b^{21, 6}_2
c    -b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_1
c    -b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨  b^{21, 6}_0
c  in DIMACS:
-13745 -13746  13747 -105  13748 0
-13745 -13746  13747 -105 -13749 0
-13745 -13746  13747 -105  13750 0

c  -1+1 --> 0
c    ( b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0 ∧  p_105) -> (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧ -b^{21, 6}_0)
c  in CNF:
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_2
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_1
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_0
c  in DIMACS:
-13745  13746 -13747 -105 -13748 0
-13745  13746 -13747 -105 -13749 0
-13745  13746 -13747 -105 -13750 0

c  0+1 --> 1
c    (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧  p_105) -> (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0)
c  in CNF:
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_2
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_1
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨  b^{21, 6}_0
c  in DIMACS:
 13745  13746  13747 -105 -13748 0
 13745  13746  13747 -105 -13749 0
 13745  13746  13747 -105  13750 0

c  1+1 --> 2
c    (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0 ∧  p_105) -> (-b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0)
c  in CNF:
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_2
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨  b^{21, 6}_1
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ -p_105 ∨ -b^{21, 6}_0
c  in DIMACS:
 13745  13746 -13747 -105 -13748 0
 13745  13746 -13747 -105  13749 0
 13745  13746 -13747 -105 -13750 0

c  2+1 --> break 
c    (-b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧  p_105) -> break
c  in CNF:
c     b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 13745 -13746  13747 -105 1162 0


c  2-1 --> 1
c    (-b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧ -p_105) -> (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0)
c  in CNF:
c     b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_2
c     b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_1
c     b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨  b^{21, 6}_0
c  in DIMACS:
 13745 -13746  13747  105 -13748 0
 13745 -13746  13747  105 -13749 0
 13745 -13746  13747  105  13750 0

c  1-1 --> 0
c    (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0 ∧ -p_105) -> (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧ -b^{21, 6}_0)
c  in CNF:
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_2
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_1
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_0
c  in DIMACS:
 13745  13746 -13747  105 -13748 0
 13745  13746 -13747  105 -13749 0
 13745  13746 -13747  105 -13750 0

c  0-1 --> -1
c    (-b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧ -p_105) -> ( b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0)
c  in CNF:
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨  b^{21, 6}_2
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_1
c     b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨  b^{21, 6}_0
c  in DIMACS:
 13745  13746  13747  105  13748 0
 13745  13746  13747  105 -13749 0
 13745  13746  13747  105  13750 0

c  -1-1 --> -2
c    ( b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧  b^{21, 5}_0 ∧ -p_105) -> ( b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0)
c  in CNF:
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨  b^{21, 6}_2
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨  b^{21, 6}_1
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨  p_105 ∨ -b^{21, 6}_0
c  in DIMACS:
-13745  13746 -13747  105  13748 0
-13745  13746 -13747  105  13749 0
-13745  13746 -13747  105 -13750 0

c  -2-1 --> break 
c    ( b^{21, 5}_2 ∧  b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨  b^{21, 5}_0 ∨  p_105 ∨ break
c  in DIMACS:
-13745 -13746  13747  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 5}_2 ∧ -b^{21, 5}_1 ∧ -b^{21, 5}_0 ∧ true) 
c  in CNF:
c    -b^{21, 5}_2 ∨  b^{21, 5}_1 ∨  b^{21, 5}_0 ∨ false 
c  in DIMACS:
-13745  13746  13747  0

c  3 does not represent an automaton state.
c    -(-b^{21, 5}_2 ∧  b^{21, 5}_1 ∧  b^{21, 5}_0 ∧ true) 
c  in CNF:
c     b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ false 
c  in DIMACS:
 13745 -13746 -13747  0
c  -3 does not represent an automaton state.
c    -( b^{21, 5}_2 ∧  b^{21, 5}_1 ∧  b^{21, 5}_0 ∧ true) 
c  in CNF:
c    -b^{21, 5}_2 ∨ -b^{21, 5}_1 ∨ -b^{21, 5}_0 ∨ false 
c  in DIMACS:
-13745 -13746 -13747  0

c i = 6
c  -2+1 --> -1
c    ( b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧  p_126) -> ( b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0)
c  in CNF:
c    -b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨  b^{21, 7}_2
c    -b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_1
c    -b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨  b^{21, 7}_0
c  in DIMACS:
-13748 -13749  13750 -126  13751 0
-13748 -13749  13750 -126 -13752 0
-13748 -13749  13750 -126  13753 0

c  -1+1 --> 0
c    ( b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0 ∧  p_126) -> (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧ -b^{21, 7}_0)
c  in CNF:
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_2
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_1
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_0
c  in DIMACS:
-13748  13749 -13750 -126 -13751 0
-13748  13749 -13750 -126 -13752 0
-13748  13749 -13750 -126 -13753 0

c  0+1 --> 1
c    (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧  p_126) -> (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0)
c  in CNF:
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_2
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_1
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨  b^{21, 7}_0
c  in DIMACS:
 13748  13749  13750 -126 -13751 0
 13748  13749  13750 -126 -13752 0
 13748  13749  13750 -126  13753 0

c  1+1 --> 2
c    (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0 ∧  p_126) -> (-b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0)
c  in CNF:
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_2
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨  b^{21, 7}_1
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ -p_126 ∨ -b^{21, 7}_0
c  in DIMACS:
 13748  13749 -13750 -126 -13751 0
 13748  13749 -13750 -126  13752 0
 13748  13749 -13750 -126 -13753 0

c  2+1 --> break 
c    (-b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧  p_126) -> break
c  in CNF:
c     b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 13748 -13749  13750 -126 1162 0


c  2-1 --> 1
c    (-b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧ -p_126) -> (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0)
c  in CNF:
c     b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_2
c     b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_1
c     b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨  b^{21, 7}_0
c  in DIMACS:
 13748 -13749  13750  126 -13751 0
 13748 -13749  13750  126 -13752 0
 13748 -13749  13750  126  13753 0

c  1-1 --> 0
c    (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0 ∧ -p_126) -> (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧ -b^{21, 7}_0)
c  in CNF:
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_2
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_1
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_0
c  in DIMACS:
 13748  13749 -13750  126 -13751 0
 13748  13749 -13750  126 -13752 0
 13748  13749 -13750  126 -13753 0

c  0-1 --> -1
c    (-b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧ -p_126) -> ( b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0)
c  in CNF:
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨  b^{21, 7}_2
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_1
c     b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨  b^{21, 7}_0
c  in DIMACS:
 13748  13749  13750  126  13751 0
 13748  13749  13750  126 -13752 0
 13748  13749  13750  126  13753 0

c  -1-1 --> -2
c    ( b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧  b^{21, 6}_0 ∧ -p_126) -> ( b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0)
c  in CNF:
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨  b^{21, 7}_2
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨  b^{21, 7}_1
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨  p_126 ∨ -b^{21, 7}_0
c  in DIMACS:
-13748  13749 -13750  126  13751 0
-13748  13749 -13750  126  13752 0
-13748  13749 -13750  126 -13753 0

c  -2-1 --> break 
c    ( b^{21, 6}_2 ∧  b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨  b^{21, 6}_0 ∨  p_126 ∨ break
c  in DIMACS:
-13748 -13749  13750  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 6}_2 ∧ -b^{21, 6}_1 ∧ -b^{21, 6}_0 ∧ true) 
c  in CNF:
c    -b^{21, 6}_2 ∨  b^{21, 6}_1 ∨  b^{21, 6}_0 ∨ false 
c  in DIMACS:
-13748  13749  13750  0

c  3 does not represent an automaton state.
c    -(-b^{21, 6}_2 ∧  b^{21, 6}_1 ∧  b^{21, 6}_0 ∧ true) 
c  in CNF:
c     b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ false 
c  in DIMACS:
 13748 -13749 -13750  0
c  -3 does not represent an automaton state.
c    -( b^{21, 6}_2 ∧  b^{21, 6}_1 ∧  b^{21, 6}_0 ∧ true) 
c  in CNF:
c    -b^{21, 6}_2 ∨ -b^{21, 6}_1 ∨ -b^{21, 6}_0 ∨ false 
c  in DIMACS:
-13748 -13749 -13750  0

c i = 7
c  -2+1 --> -1
c    ( b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧  p_147) -> ( b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0)
c  in CNF:
c    -b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨  b^{21, 8}_2
c    -b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_1
c    -b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨  b^{21, 8}_0
c  in DIMACS:
-13751 -13752  13753 -147  13754 0
-13751 -13752  13753 -147 -13755 0
-13751 -13752  13753 -147  13756 0

c  -1+1 --> 0
c    ( b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0 ∧  p_147) -> (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧ -b^{21, 8}_0)
c  in CNF:
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_2
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_1
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_0
c  in DIMACS:
-13751  13752 -13753 -147 -13754 0
-13751  13752 -13753 -147 -13755 0
-13751  13752 -13753 -147 -13756 0

c  0+1 --> 1
c    (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧  p_147) -> (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0)
c  in CNF:
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_2
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_1
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨  b^{21, 8}_0
c  in DIMACS:
 13751  13752  13753 -147 -13754 0
 13751  13752  13753 -147 -13755 0
 13751  13752  13753 -147  13756 0

c  1+1 --> 2
c    (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0 ∧  p_147) -> (-b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0)
c  in CNF:
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_2
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨  b^{21, 8}_1
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ -p_147 ∨ -b^{21, 8}_0
c  in DIMACS:
 13751  13752 -13753 -147 -13754 0
 13751  13752 -13753 -147  13755 0
 13751  13752 -13753 -147 -13756 0

c  2+1 --> break 
c    (-b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧  p_147) -> break
c  in CNF:
c     b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 13751 -13752  13753 -147 1162 0


c  2-1 --> 1
c    (-b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧ -p_147) -> (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0)
c  in CNF:
c     b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_2
c     b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_1
c     b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨  b^{21, 8}_0
c  in DIMACS:
 13751 -13752  13753  147 -13754 0
 13751 -13752  13753  147 -13755 0
 13751 -13752  13753  147  13756 0

c  1-1 --> 0
c    (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0 ∧ -p_147) -> (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧ -b^{21, 8}_0)
c  in CNF:
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_2
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_1
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_0
c  in DIMACS:
 13751  13752 -13753  147 -13754 0
 13751  13752 -13753  147 -13755 0
 13751  13752 -13753  147 -13756 0

c  0-1 --> -1
c    (-b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧ -p_147) -> ( b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0)
c  in CNF:
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨  b^{21, 8}_2
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_1
c     b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨  b^{21, 8}_0
c  in DIMACS:
 13751  13752  13753  147  13754 0
 13751  13752  13753  147 -13755 0
 13751  13752  13753  147  13756 0

c  -1-1 --> -2
c    ( b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧  b^{21, 7}_0 ∧ -p_147) -> ( b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0)
c  in CNF:
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨  b^{21, 8}_2
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨  b^{21, 8}_1
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨  p_147 ∨ -b^{21, 8}_0
c  in DIMACS:
-13751  13752 -13753  147  13754 0
-13751  13752 -13753  147  13755 0
-13751  13752 -13753  147 -13756 0

c  -2-1 --> break 
c    ( b^{21, 7}_2 ∧  b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨  b^{21, 7}_0 ∨  p_147 ∨ break
c  in DIMACS:
-13751 -13752  13753  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 7}_2 ∧ -b^{21, 7}_1 ∧ -b^{21, 7}_0 ∧ true) 
c  in CNF:
c    -b^{21, 7}_2 ∨  b^{21, 7}_1 ∨  b^{21, 7}_0 ∨ false 
c  in DIMACS:
-13751  13752  13753  0

c  3 does not represent an automaton state.
c    -(-b^{21, 7}_2 ∧  b^{21, 7}_1 ∧  b^{21, 7}_0 ∧ true) 
c  in CNF:
c     b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ false 
c  in DIMACS:
 13751 -13752 -13753  0
c  -3 does not represent an automaton state.
c    -( b^{21, 7}_2 ∧  b^{21, 7}_1 ∧  b^{21, 7}_0 ∧ true) 
c  in CNF:
c    -b^{21, 7}_2 ∨ -b^{21, 7}_1 ∨ -b^{21, 7}_0 ∨ false 
c  in DIMACS:
-13751 -13752 -13753  0

c i = 8
c  -2+1 --> -1
c    ( b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧  p_168) -> ( b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0)
c  in CNF:
c    -b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨  b^{21, 9}_2
c    -b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_1
c    -b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨  b^{21, 9}_0
c  in DIMACS:
-13754 -13755  13756 -168  13757 0
-13754 -13755  13756 -168 -13758 0
-13754 -13755  13756 -168  13759 0

c  -1+1 --> 0
c    ( b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0 ∧  p_168) -> (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧ -b^{21, 9}_0)
c  in CNF:
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_2
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_1
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_0
c  in DIMACS:
-13754  13755 -13756 -168 -13757 0
-13754  13755 -13756 -168 -13758 0
-13754  13755 -13756 -168 -13759 0

c  0+1 --> 1
c    (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧  p_168) -> (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0)
c  in CNF:
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_2
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_1
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨  b^{21, 9}_0
c  in DIMACS:
 13754  13755  13756 -168 -13757 0
 13754  13755  13756 -168 -13758 0
 13754  13755  13756 -168  13759 0

c  1+1 --> 2
c    (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0 ∧  p_168) -> (-b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0)
c  in CNF:
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_2
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨  b^{21, 9}_1
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ -p_168 ∨ -b^{21, 9}_0
c  in DIMACS:
 13754  13755 -13756 -168 -13757 0
 13754  13755 -13756 -168  13758 0
 13754  13755 -13756 -168 -13759 0

c  2+1 --> break 
c    (-b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧  p_168) -> break
c  in CNF:
c     b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 13754 -13755  13756 -168 1162 0


c  2-1 --> 1
c    (-b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧ -p_168) -> (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0)
c  in CNF:
c     b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_2
c     b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_1
c     b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨  b^{21, 9}_0
c  in DIMACS:
 13754 -13755  13756  168 -13757 0
 13754 -13755  13756  168 -13758 0
 13754 -13755  13756  168  13759 0

c  1-1 --> 0
c    (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0 ∧ -p_168) -> (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧ -b^{21, 9}_0)
c  in CNF:
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_2
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_1
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_0
c  in DIMACS:
 13754  13755 -13756  168 -13757 0
 13754  13755 -13756  168 -13758 0
 13754  13755 -13756  168 -13759 0

c  0-1 --> -1
c    (-b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧ -p_168) -> ( b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0)
c  in CNF:
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨  b^{21, 9}_2
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_1
c     b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨  b^{21, 9}_0
c  in DIMACS:
 13754  13755  13756  168  13757 0
 13754  13755  13756  168 -13758 0
 13754  13755  13756  168  13759 0

c  -1-1 --> -2
c    ( b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧  b^{21, 8}_0 ∧ -p_168) -> ( b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0)
c  in CNF:
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨  b^{21, 9}_2
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨  b^{21, 9}_1
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨  p_168 ∨ -b^{21, 9}_0
c  in DIMACS:
-13754  13755 -13756  168  13757 0
-13754  13755 -13756  168  13758 0
-13754  13755 -13756  168 -13759 0

c  -2-1 --> break 
c    ( b^{21, 8}_2 ∧  b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨  b^{21, 8}_0 ∨  p_168 ∨ break
c  in DIMACS:
-13754 -13755  13756  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 8}_2 ∧ -b^{21, 8}_1 ∧ -b^{21, 8}_0 ∧ true) 
c  in CNF:
c    -b^{21, 8}_2 ∨  b^{21, 8}_1 ∨  b^{21, 8}_0 ∨ false 
c  in DIMACS:
-13754  13755  13756  0

c  3 does not represent an automaton state.
c    -(-b^{21, 8}_2 ∧  b^{21, 8}_1 ∧  b^{21, 8}_0 ∧ true) 
c  in CNF:
c     b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ false 
c  in DIMACS:
 13754 -13755 -13756  0
c  -3 does not represent an automaton state.
c    -( b^{21, 8}_2 ∧  b^{21, 8}_1 ∧  b^{21, 8}_0 ∧ true) 
c  in CNF:
c    -b^{21, 8}_2 ∨ -b^{21, 8}_1 ∨ -b^{21, 8}_0 ∨ false 
c  in DIMACS:
-13754 -13755 -13756  0

c i = 9
c  -2+1 --> -1
c    ( b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧  p_189) -> ( b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0)
c  in CNF:
c    -b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨  b^{21, 10}_2
c    -b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_1
c    -b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨  b^{21, 10}_0
c  in DIMACS:
-13757 -13758  13759 -189  13760 0
-13757 -13758  13759 -189 -13761 0
-13757 -13758  13759 -189  13762 0

c  -1+1 --> 0
c    ( b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0 ∧  p_189) -> (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧ -b^{21, 10}_0)
c  in CNF:
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_2
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_1
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_0
c  in DIMACS:
-13757  13758 -13759 -189 -13760 0
-13757  13758 -13759 -189 -13761 0
-13757  13758 -13759 -189 -13762 0

c  0+1 --> 1
c    (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧  p_189) -> (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0)
c  in CNF:
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_2
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_1
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨  b^{21, 10}_0
c  in DIMACS:
 13757  13758  13759 -189 -13760 0
 13757  13758  13759 -189 -13761 0
 13757  13758  13759 -189  13762 0

c  1+1 --> 2
c    (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0 ∧  p_189) -> (-b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0)
c  in CNF:
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_2
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨  b^{21, 10}_1
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ -p_189 ∨ -b^{21, 10}_0
c  in DIMACS:
 13757  13758 -13759 -189 -13760 0
 13757  13758 -13759 -189  13761 0
 13757  13758 -13759 -189 -13762 0

c  2+1 --> break 
c    (-b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧  p_189) -> break
c  in CNF:
c     b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 13757 -13758  13759 -189 1162 0


c  2-1 --> 1
c    (-b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧ -p_189) -> (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0)
c  in CNF:
c     b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_2
c     b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_1
c     b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨  b^{21, 10}_0
c  in DIMACS:
 13757 -13758  13759  189 -13760 0
 13757 -13758  13759  189 -13761 0
 13757 -13758  13759  189  13762 0

c  1-1 --> 0
c    (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0 ∧ -p_189) -> (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧ -b^{21, 10}_0)
c  in CNF:
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_2
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_1
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_0
c  in DIMACS:
 13757  13758 -13759  189 -13760 0
 13757  13758 -13759  189 -13761 0
 13757  13758 -13759  189 -13762 0

c  0-1 --> -1
c    (-b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧ -p_189) -> ( b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0)
c  in CNF:
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨  b^{21, 10}_2
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_1
c     b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨  b^{21, 10}_0
c  in DIMACS:
 13757  13758  13759  189  13760 0
 13757  13758  13759  189 -13761 0
 13757  13758  13759  189  13762 0

c  -1-1 --> -2
c    ( b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧  b^{21, 9}_0 ∧ -p_189) -> ( b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0)
c  in CNF:
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨  b^{21, 10}_2
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨  b^{21, 10}_1
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨  p_189 ∨ -b^{21, 10}_0
c  in DIMACS:
-13757  13758 -13759  189  13760 0
-13757  13758 -13759  189  13761 0
-13757  13758 -13759  189 -13762 0

c  -2-1 --> break 
c    ( b^{21, 9}_2 ∧  b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨  b^{21, 9}_0 ∨  p_189 ∨ break
c  in DIMACS:
-13757 -13758  13759  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 9}_2 ∧ -b^{21, 9}_1 ∧ -b^{21, 9}_0 ∧ true) 
c  in CNF:
c    -b^{21, 9}_2 ∨  b^{21, 9}_1 ∨  b^{21, 9}_0 ∨ false 
c  in DIMACS:
-13757  13758  13759  0

c  3 does not represent an automaton state.
c    -(-b^{21, 9}_2 ∧  b^{21, 9}_1 ∧  b^{21, 9}_0 ∧ true) 
c  in CNF:
c     b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ false 
c  in DIMACS:
 13757 -13758 -13759  0
c  -3 does not represent an automaton state.
c    -( b^{21, 9}_2 ∧  b^{21, 9}_1 ∧  b^{21, 9}_0 ∧ true) 
c  in CNF:
c    -b^{21, 9}_2 ∨ -b^{21, 9}_1 ∨ -b^{21, 9}_0 ∨ false 
c  in DIMACS:
-13757 -13758 -13759  0

c i = 10
c  -2+1 --> -1
c    ( b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧  p_210) -> ( b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0)
c  in CNF:
c    -b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨  b^{21, 11}_2
c    -b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_1
c    -b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨  b^{21, 11}_0
c  in DIMACS:
-13760 -13761  13762 -210  13763 0
-13760 -13761  13762 -210 -13764 0
-13760 -13761  13762 -210  13765 0

c  -1+1 --> 0
c    ( b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0 ∧  p_210) -> (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧ -b^{21, 11}_0)
c  in CNF:
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_2
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_1
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_0
c  in DIMACS:
-13760  13761 -13762 -210 -13763 0
-13760  13761 -13762 -210 -13764 0
-13760  13761 -13762 -210 -13765 0

c  0+1 --> 1
c    (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧  p_210) -> (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0)
c  in CNF:
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_2
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_1
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨  b^{21, 11}_0
c  in DIMACS:
 13760  13761  13762 -210 -13763 0
 13760  13761  13762 -210 -13764 0
 13760  13761  13762 -210  13765 0

c  1+1 --> 2
c    (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0 ∧  p_210) -> (-b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0)
c  in CNF:
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_2
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨  b^{21, 11}_1
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ -p_210 ∨ -b^{21, 11}_0
c  in DIMACS:
 13760  13761 -13762 -210 -13763 0
 13760  13761 -13762 -210  13764 0
 13760  13761 -13762 -210 -13765 0

c  2+1 --> break 
c    (-b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧  p_210) -> break
c  in CNF:
c     b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 13760 -13761  13762 -210 1162 0


c  2-1 --> 1
c    (-b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧ -p_210) -> (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0)
c  in CNF:
c     b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_2
c     b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_1
c     b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨  b^{21, 11}_0
c  in DIMACS:
 13760 -13761  13762  210 -13763 0
 13760 -13761  13762  210 -13764 0
 13760 -13761  13762  210  13765 0

c  1-1 --> 0
c    (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0 ∧ -p_210) -> (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧ -b^{21, 11}_0)
c  in CNF:
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_2
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_1
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_0
c  in DIMACS:
 13760  13761 -13762  210 -13763 0
 13760  13761 -13762  210 -13764 0
 13760  13761 -13762  210 -13765 0

c  0-1 --> -1
c    (-b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧ -p_210) -> ( b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0)
c  in CNF:
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨  b^{21, 11}_2
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_1
c     b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨  b^{21, 11}_0
c  in DIMACS:
 13760  13761  13762  210  13763 0
 13760  13761  13762  210 -13764 0
 13760  13761  13762  210  13765 0

c  -1-1 --> -2
c    ( b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧  b^{21, 10}_0 ∧ -p_210) -> ( b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0)
c  in CNF:
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨  b^{21, 11}_2
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨  b^{21, 11}_1
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨  p_210 ∨ -b^{21, 11}_0
c  in DIMACS:
-13760  13761 -13762  210  13763 0
-13760  13761 -13762  210  13764 0
-13760  13761 -13762  210 -13765 0

c  -2-1 --> break 
c    ( b^{21, 10}_2 ∧  b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨  b^{21, 10}_0 ∨  p_210 ∨ break
c  in DIMACS:
-13760 -13761  13762  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 10}_2 ∧ -b^{21, 10}_1 ∧ -b^{21, 10}_0 ∧ true) 
c  in CNF:
c    -b^{21, 10}_2 ∨  b^{21, 10}_1 ∨  b^{21, 10}_0 ∨ false 
c  in DIMACS:
-13760  13761  13762  0

c  3 does not represent an automaton state.
c    -(-b^{21, 10}_2 ∧  b^{21, 10}_1 ∧  b^{21, 10}_0 ∧ true) 
c  in CNF:
c     b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ false 
c  in DIMACS:
 13760 -13761 -13762  0
c  -3 does not represent an automaton state.
c    -( b^{21, 10}_2 ∧  b^{21, 10}_1 ∧  b^{21, 10}_0 ∧ true) 
c  in CNF:
c    -b^{21, 10}_2 ∨ -b^{21, 10}_1 ∨ -b^{21, 10}_0 ∨ false 
c  in DIMACS:
-13760 -13761 -13762  0

c i = 11
c  -2+1 --> -1
c    ( b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧  p_231) -> ( b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0)
c  in CNF:
c    -b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨  b^{21, 12}_2
c    -b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_1
c    -b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨  b^{21, 12}_0
c  in DIMACS:
-13763 -13764  13765 -231  13766 0
-13763 -13764  13765 -231 -13767 0
-13763 -13764  13765 -231  13768 0

c  -1+1 --> 0
c    ( b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0 ∧  p_231) -> (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧ -b^{21, 12}_0)
c  in CNF:
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_2
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_1
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_0
c  in DIMACS:
-13763  13764 -13765 -231 -13766 0
-13763  13764 -13765 -231 -13767 0
-13763  13764 -13765 -231 -13768 0

c  0+1 --> 1
c    (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧  p_231) -> (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0)
c  in CNF:
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_2
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_1
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨  b^{21, 12}_0
c  in DIMACS:
 13763  13764  13765 -231 -13766 0
 13763  13764  13765 -231 -13767 0
 13763  13764  13765 -231  13768 0

c  1+1 --> 2
c    (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0 ∧  p_231) -> (-b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0)
c  in CNF:
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_2
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨  b^{21, 12}_1
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ -p_231 ∨ -b^{21, 12}_0
c  in DIMACS:
 13763  13764 -13765 -231 -13766 0
 13763  13764 -13765 -231  13767 0
 13763  13764 -13765 -231 -13768 0

c  2+1 --> break 
c    (-b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧  p_231) -> break
c  in CNF:
c     b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 13763 -13764  13765 -231 1162 0


c  2-1 --> 1
c    (-b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧ -p_231) -> (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0)
c  in CNF:
c     b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_2
c     b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_1
c     b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨  b^{21, 12}_0
c  in DIMACS:
 13763 -13764  13765  231 -13766 0
 13763 -13764  13765  231 -13767 0
 13763 -13764  13765  231  13768 0

c  1-1 --> 0
c    (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0 ∧ -p_231) -> (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧ -b^{21, 12}_0)
c  in CNF:
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_2
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_1
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_0
c  in DIMACS:
 13763  13764 -13765  231 -13766 0
 13763  13764 -13765  231 -13767 0
 13763  13764 -13765  231 -13768 0

c  0-1 --> -1
c    (-b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧ -p_231) -> ( b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0)
c  in CNF:
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨  b^{21, 12}_2
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_1
c     b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨  b^{21, 12}_0
c  in DIMACS:
 13763  13764  13765  231  13766 0
 13763  13764  13765  231 -13767 0
 13763  13764  13765  231  13768 0

c  -1-1 --> -2
c    ( b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧  b^{21, 11}_0 ∧ -p_231) -> ( b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0)
c  in CNF:
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨  b^{21, 12}_2
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨  b^{21, 12}_1
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨  p_231 ∨ -b^{21, 12}_0
c  in DIMACS:
-13763  13764 -13765  231  13766 0
-13763  13764 -13765  231  13767 0
-13763  13764 -13765  231 -13768 0

c  -2-1 --> break 
c    ( b^{21, 11}_2 ∧  b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨  b^{21, 11}_0 ∨  p_231 ∨ break
c  in DIMACS:
-13763 -13764  13765  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 11}_2 ∧ -b^{21, 11}_1 ∧ -b^{21, 11}_0 ∧ true) 
c  in CNF:
c    -b^{21, 11}_2 ∨  b^{21, 11}_1 ∨  b^{21, 11}_0 ∨ false 
c  in DIMACS:
-13763  13764  13765  0

c  3 does not represent an automaton state.
c    -(-b^{21, 11}_2 ∧  b^{21, 11}_1 ∧  b^{21, 11}_0 ∧ true) 
c  in CNF:
c     b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ false 
c  in DIMACS:
 13763 -13764 -13765  0
c  -3 does not represent an automaton state.
c    -( b^{21, 11}_2 ∧  b^{21, 11}_1 ∧  b^{21, 11}_0 ∧ true) 
c  in CNF:
c    -b^{21, 11}_2 ∨ -b^{21, 11}_1 ∨ -b^{21, 11}_0 ∨ false 
c  in DIMACS:
-13763 -13764 -13765  0

c i = 12
c  -2+1 --> -1
c    ( b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧  p_252) -> ( b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0)
c  in CNF:
c    -b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨  b^{21, 13}_2
c    -b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_1
c    -b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨  b^{21, 13}_0
c  in DIMACS:
-13766 -13767  13768 -252  13769 0
-13766 -13767  13768 -252 -13770 0
-13766 -13767  13768 -252  13771 0

c  -1+1 --> 0
c    ( b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0 ∧  p_252) -> (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧ -b^{21, 13}_0)
c  in CNF:
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_2
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_1
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_0
c  in DIMACS:
-13766  13767 -13768 -252 -13769 0
-13766  13767 -13768 -252 -13770 0
-13766  13767 -13768 -252 -13771 0

c  0+1 --> 1
c    (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧  p_252) -> (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0)
c  in CNF:
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_2
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_1
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨  b^{21, 13}_0
c  in DIMACS:
 13766  13767  13768 -252 -13769 0
 13766  13767  13768 -252 -13770 0
 13766  13767  13768 -252  13771 0

c  1+1 --> 2
c    (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0 ∧  p_252) -> (-b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0)
c  in CNF:
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_2
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨  b^{21, 13}_1
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ -p_252 ∨ -b^{21, 13}_0
c  in DIMACS:
 13766  13767 -13768 -252 -13769 0
 13766  13767 -13768 -252  13770 0
 13766  13767 -13768 -252 -13771 0

c  2+1 --> break 
c    (-b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧  p_252) -> break
c  in CNF:
c     b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 13766 -13767  13768 -252 1162 0


c  2-1 --> 1
c    (-b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧ -p_252) -> (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0)
c  in CNF:
c     b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_2
c     b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_1
c     b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨  b^{21, 13}_0
c  in DIMACS:
 13766 -13767  13768  252 -13769 0
 13766 -13767  13768  252 -13770 0
 13766 -13767  13768  252  13771 0

c  1-1 --> 0
c    (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0 ∧ -p_252) -> (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧ -b^{21, 13}_0)
c  in CNF:
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_2
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_1
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_0
c  in DIMACS:
 13766  13767 -13768  252 -13769 0
 13766  13767 -13768  252 -13770 0
 13766  13767 -13768  252 -13771 0

c  0-1 --> -1
c    (-b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧ -p_252) -> ( b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0)
c  in CNF:
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨  b^{21, 13}_2
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_1
c     b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨  b^{21, 13}_0
c  in DIMACS:
 13766  13767  13768  252  13769 0
 13766  13767  13768  252 -13770 0
 13766  13767  13768  252  13771 0

c  -1-1 --> -2
c    ( b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧  b^{21, 12}_0 ∧ -p_252) -> ( b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0)
c  in CNF:
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨  b^{21, 13}_2
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨  b^{21, 13}_1
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨  p_252 ∨ -b^{21, 13}_0
c  in DIMACS:
-13766  13767 -13768  252  13769 0
-13766  13767 -13768  252  13770 0
-13766  13767 -13768  252 -13771 0

c  -2-1 --> break 
c    ( b^{21, 12}_2 ∧  b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨  b^{21, 12}_0 ∨  p_252 ∨ break
c  in DIMACS:
-13766 -13767  13768  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 12}_2 ∧ -b^{21, 12}_1 ∧ -b^{21, 12}_0 ∧ true) 
c  in CNF:
c    -b^{21, 12}_2 ∨  b^{21, 12}_1 ∨  b^{21, 12}_0 ∨ false 
c  in DIMACS:
-13766  13767  13768  0

c  3 does not represent an automaton state.
c    -(-b^{21, 12}_2 ∧  b^{21, 12}_1 ∧  b^{21, 12}_0 ∧ true) 
c  in CNF:
c     b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ false 
c  in DIMACS:
 13766 -13767 -13768  0
c  -3 does not represent an automaton state.
c    -( b^{21, 12}_2 ∧  b^{21, 12}_1 ∧  b^{21, 12}_0 ∧ true) 
c  in CNF:
c    -b^{21, 12}_2 ∨ -b^{21, 12}_1 ∨ -b^{21, 12}_0 ∨ false 
c  in DIMACS:
-13766 -13767 -13768  0

c i = 13
c  -2+1 --> -1
c    ( b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧  p_273) -> ( b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0)
c  in CNF:
c    -b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨  b^{21, 14}_2
c    -b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_1
c    -b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨  b^{21, 14}_0
c  in DIMACS:
-13769 -13770  13771 -273  13772 0
-13769 -13770  13771 -273 -13773 0
-13769 -13770  13771 -273  13774 0

c  -1+1 --> 0
c    ( b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0 ∧  p_273) -> (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧ -b^{21, 14}_0)
c  in CNF:
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_2
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_1
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_0
c  in DIMACS:
-13769  13770 -13771 -273 -13772 0
-13769  13770 -13771 -273 -13773 0
-13769  13770 -13771 -273 -13774 0

c  0+1 --> 1
c    (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧  p_273) -> (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0)
c  in CNF:
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_2
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_1
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨  b^{21, 14}_0
c  in DIMACS:
 13769  13770  13771 -273 -13772 0
 13769  13770  13771 -273 -13773 0
 13769  13770  13771 -273  13774 0

c  1+1 --> 2
c    (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0 ∧  p_273) -> (-b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0)
c  in CNF:
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_2
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨  b^{21, 14}_1
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ -p_273 ∨ -b^{21, 14}_0
c  in DIMACS:
 13769  13770 -13771 -273 -13772 0
 13769  13770 -13771 -273  13773 0
 13769  13770 -13771 -273 -13774 0

c  2+1 --> break 
c    (-b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧  p_273) -> break
c  in CNF:
c     b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 13769 -13770  13771 -273 1162 0


c  2-1 --> 1
c    (-b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧ -p_273) -> (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0)
c  in CNF:
c     b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_2
c     b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_1
c     b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨  b^{21, 14}_0
c  in DIMACS:
 13769 -13770  13771  273 -13772 0
 13769 -13770  13771  273 -13773 0
 13769 -13770  13771  273  13774 0

c  1-1 --> 0
c    (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0 ∧ -p_273) -> (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧ -b^{21, 14}_0)
c  in CNF:
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_2
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_1
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_0
c  in DIMACS:
 13769  13770 -13771  273 -13772 0
 13769  13770 -13771  273 -13773 0
 13769  13770 -13771  273 -13774 0

c  0-1 --> -1
c    (-b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧ -p_273) -> ( b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0)
c  in CNF:
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨  b^{21, 14}_2
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_1
c     b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨  b^{21, 14}_0
c  in DIMACS:
 13769  13770  13771  273  13772 0
 13769  13770  13771  273 -13773 0
 13769  13770  13771  273  13774 0

c  -1-1 --> -2
c    ( b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧  b^{21, 13}_0 ∧ -p_273) -> ( b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0)
c  in CNF:
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨  b^{21, 14}_2
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨  b^{21, 14}_1
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨  p_273 ∨ -b^{21, 14}_0
c  in DIMACS:
-13769  13770 -13771  273  13772 0
-13769  13770 -13771  273  13773 0
-13769  13770 -13771  273 -13774 0

c  -2-1 --> break 
c    ( b^{21, 13}_2 ∧  b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨  b^{21, 13}_0 ∨  p_273 ∨ break
c  in DIMACS:
-13769 -13770  13771  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 13}_2 ∧ -b^{21, 13}_1 ∧ -b^{21, 13}_0 ∧ true) 
c  in CNF:
c    -b^{21, 13}_2 ∨  b^{21, 13}_1 ∨  b^{21, 13}_0 ∨ false 
c  in DIMACS:
-13769  13770  13771  0

c  3 does not represent an automaton state.
c    -(-b^{21, 13}_2 ∧  b^{21, 13}_1 ∧  b^{21, 13}_0 ∧ true) 
c  in CNF:
c     b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ false 
c  in DIMACS:
 13769 -13770 -13771  0
c  -3 does not represent an automaton state.
c    -( b^{21, 13}_2 ∧  b^{21, 13}_1 ∧  b^{21, 13}_0 ∧ true) 
c  in CNF:
c    -b^{21, 13}_2 ∨ -b^{21, 13}_1 ∨ -b^{21, 13}_0 ∨ false 
c  in DIMACS:
-13769 -13770 -13771  0

c i = 14
c  -2+1 --> -1
c    ( b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧  p_294) -> ( b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0)
c  in CNF:
c    -b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨  b^{21, 15}_2
c    -b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_1
c    -b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨  b^{21, 15}_0
c  in DIMACS:
-13772 -13773  13774 -294  13775 0
-13772 -13773  13774 -294 -13776 0
-13772 -13773  13774 -294  13777 0

c  -1+1 --> 0
c    ( b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0 ∧  p_294) -> (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧ -b^{21, 15}_0)
c  in CNF:
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_2
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_1
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_0
c  in DIMACS:
-13772  13773 -13774 -294 -13775 0
-13772  13773 -13774 -294 -13776 0
-13772  13773 -13774 -294 -13777 0

c  0+1 --> 1
c    (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧  p_294) -> (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0)
c  in CNF:
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_2
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_1
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨  b^{21, 15}_0
c  in DIMACS:
 13772  13773  13774 -294 -13775 0
 13772  13773  13774 -294 -13776 0
 13772  13773  13774 -294  13777 0

c  1+1 --> 2
c    (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0 ∧  p_294) -> (-b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0)
c  in CNF:
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_2
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨  b^{21, 15}_1
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ -p_294 ∨ -b^{21, 15}_0
c  in DIMACS:
 13772  13773 -13774 -294 -13775 0
 13772  13773 -13774 -294  13776 0
 13772  13773 -13774 -294 -13777 0

c  2+1 --> break 
c    (-b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧  p_294) -> break
c  in CNF:
c     b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 13772 -13773  13774 -294 1162 0


c  2-1 --> 1
c    (-b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧ -p_294) -> (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0)
c  in CNF:
c     b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_2
c     b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_1
c     b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨  b^{21, 15}_0
c  in DIMACS:
 13772 -13773  13774  294 -13775 0
 13772 -13773  13774  294 -13776 0
 13772 -13773  13774  294  13777 0

c  1-1 --> 0
c    (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0 ∧ -p_294) -> (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧ -b^{21, 15}_0)
c  in CNF:
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_2
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_1
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_0
c  in DIMACS:
 13772  13773 -13774  294 -13775 0
 13772  13773 -13774  294 -13776 0
 13772  13773 -13774  294 -13777 0

c  0-1 --> -1
c    (-b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧ -p_294) -> ( b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0)
c  in CNF:
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨  b^{21, 15}_2
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_1
c     b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨  b^{21, 15}_0
c  in DIMACS:
 13772  13773  13774  294  13775 0
 13772  13773  13774  294 -13776 0
 13772  13773  13774  294  13777 0

c  -1-1 --> -2
c    ( b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧  b^{21, 14}_0 ∧ -p_294) -> ( b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0)
c  in CNF:
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨  b^{21, 15}_2
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨  b^{21, 15}_1
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨  p_294 ∨ -b^{21, 15}_0
c  in DIMACS:
-13772  13773 -13774  294  13775 0
-13772  13773 -13774  294  13776 0
-13772  13773 -13774  294 -13777 0

c  -2-1 --> break 
c    ( b^{21, 14}_2 ∧  b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨  b^{21, 14}_0 ∨  p_294 ∨ break
c  in DIMACS:
-13772 -13773  13774  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 14}_2 ∧ -b^{21, 14}_1 ∧ -b^{21, 14}_0 ∧ true) 
c  in CNF:
c    -b^{21, 14}_2 ∨  b^{21, 14}_1 ∨  b^{21, 14}_0 ∨ false 
c  in DIMACS:
-13772  13773  13774  0

c  3 does not represent an automaton state.
c    -(-b^{21, 14}_2 ∧  b^{21, 14}_1 ∧  b^{21, 14}_0 ∧ true) 
c  in CNF:
c     b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ false 
c  in DIMACS:
 13772 -13773 -13774  0
c  -3 does not represent an automaton state.
c    -( b^{21, 14}_2 ∧  b^{21, 14}_1 ∧  b^{21, 14}_0 ∧ true) 
c  in CNF:
c    -b^{21, 14}_2 ∨ -b^{21, 14}_1 ∨ -b^{21, 14}_0 ∨ false 
c  in DIMACS:
-13772 -13773 -13774  0

c i = 15
c  -2+1 --> -1
c    ( b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧  p_315) -> ( b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0)
c  in CNF:
c    -b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨  b^{21, 16}_2
c    -b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_1
c    -b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨  b^{21, 16}_0
c  in DIMACS:
-13775 -13776  13777 -315  13778 0
-13775 -13776  13777 -315 -13779 0
-13775 -13776  13777 -315  13780 0

c  -1+1 --> 0
c    ( b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0 ∧  p_315) -> (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧ -b^{21, 16}_0)
c  in CNF:
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_2
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_1
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_0
c  in DIMACS:
-13775  13776 -13777 -315 -13778 0
-13775  13776 -13777 -315 -13779 0
-13775  13776 -13777 -315 -13780 0

c  0+1 --> 1
c    (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧  p_315) -> (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0)
c  in CNF:
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_2
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_1
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨  b^{21, 16}_0
c  in DIMACS:
 13775  13776  13777 -315 -13778 0
 13775  13776  13777 -315 -13779 0
 13775  13776  13777 -315  13780 0

c  1+1 --> 2
c    (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0 ∧  p_315) -> (-b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0)
c  in CNF:
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_2
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨  b^{21, 16}_1
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ -p_315 ∨ -b^{21, 16}_0
c  in DIMACS:
 13775  13776 -13777 -315 -13778 0
 13775  13776 -13777 -315  13779 0
 13775  13776 -13777 -315 -13780 0

c  2+1 --> break 
c    (-b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧  p_315) -> break
c  in CNF:
c     b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 13775 -13776  13777 -315 1162 0


c  2-1 --> 1
c    (-b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧ -p_315) -> (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0)
c  in CNF:
c     b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_2
c     b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_1
c     b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨  b^{21, 16}_0
c  in DIMACS:
 13775 -13776  13777  315 -13778 0
 13775 -13776  13777  315 -13779 0
 13775 -13776  13777  315  13780 0

c  1-1 --> 0
c    (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0 ∧ -p_315) -> (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧ -b^{21, 16}_0)
c  in CNF:
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_2
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_1
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_0
c  in DIMACS:
 13775  13776 -13777  315 -13778 0
 13775  13776 -13777  315 -13779 0
 13775  13776 -13777  315 -13780 0

c  0-1 --> -1
c    (-b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧ -p_315) -> ( b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0)
c  in CNF:
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨  b^{21, 16}_2
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_1
c     b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨  b^{21, 16}_0
c  in DIMACS:
 13775  13776  13777  315  13778 0
 13775  13776  13777  315 -13779 0
 13775  13776  13777  315  13780 0

c  -1-1 --> -2
c    ( b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧  b^{21, 15}_0 ∧ -p_315) -> ( b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0)
c  in CNF:
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨  b^{21, 16}_2
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨  b^{21, 16}_1
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨  p_315 ∨ -b^{21, 16}_0
c  in DIMACS:
-13775  13776 -13777  315  13778 0
-13775  13776 -13777  315  13779 0
-13775  13776 -13777  315 -13780 0

c  -2-1 --> break 
c    ( b^{21, 15}_2 ∧  b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨  b^{21, 15}_0 ∨  p_315 ∨ break
c  in DIMACS:
-13775 -13776  13777  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 15}_2 ∧ -b^{21, 15}_1 ∧ -b^{21, 15}_0 ∧ true) 
c  in CNF:
c    -b^{21, 15}_2 ∨  b^{21, 15}_1 ∨  b^{21, 15}_0 ∨ false 
c  in DIMACS:
-13775  13776  13777  0

c  3 does not represent an automaton state.
c    -(-b^{21, 15}_2 ∧  b^{21, 15}_1 ∧  b^{21, 15}_0 ∧ true) 
c  in CNF:
c     b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ false 
c  in DIMACS:
 13775 -13776 -13777  0
c  -3 does not represent an automaton state.
c    -( b^{21, 15}_2 ∧  b^{21, 15}_1 ∧  b^{21, 15}_0 ∧ true) 
c  in CNF:
c    -b^{21, 15}_2 ∨ -b^{21, 15}_1 ∨ -b^{21, 15}_0 ∨ false 
c  in DIMACS:
-13775 -13776 -13777  0

c i = 16
c  -2+1 --> -1
c    ( b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧  p_336) -> ( b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0)
c  in CNF:
c    -b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨  b^{21, 17}_2
c    -b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_1
c    -b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨  b^{21, 17}_0
c  in DIMACS:
-13778 -13779  13780 -336  13781 0
-13778 -13779  13780 -336 -13782 0
-13778 -13779  13780 -336  13783 0

c  -1+1 --> 0
c    ( b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0 ∧  p_336) -> (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧ -b^{21, 17}_0)
c  in CNF:
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_2
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_1
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_0
c  in DIMACS:
-13778  13779 -13780 -336 -13781 0
-13778  13779 -13780 -336 -13782 0
-13778  13779 -13780 -336 -13783 0

c  0+1 --> 1
c    (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧  p_336) -> (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0)
c  in CNF:
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_2
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_1
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨  b^{21, 17}_0
c  in DIMACS:
 13778  13779  13780 -336 -13781 0
 13778  13779  13780 -336 -13782 0
 13778  13779  13780 -336  13783 0

c  1+1 --> 2
c    (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0 ∧  p_336) -> (-b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0)
c  in CNF:
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_2
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨  b^{21, 17}_1
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ -p_336 ∨ -b^{21, 17}_0
c  in DIMACS:
 13778  13779 -13780 -336 -13781 0
 13778  13779 -13780 -336  13782 0
 13778  13779 -13780 -336 -13783 0

c  2+1 --> break 
c    (-b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧  p_336) -> break
c  in CNF:
c     b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 13778 -13779  13780 -336 1162 0


c  2-1 --> 1
c    (-b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧ -p_336) -> (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0)
c  in CNF:
c     b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_2
c     b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_1
c     b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨  b^{21, 17}_0
c  in DIMACS:
 13778 -13779  13780  336 -13781 0
 13778 -13779  13780  336 -13782 0
 13778 -13779  13780  336  13783 0

c  1-1 --> 0
c    (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0 ∧ -p_336) -> (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧ -b^{21, 17}_0)
c  in CNF:
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_2
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_1
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_0
c  in DIMACS:
 13778  13779 -13780  336 -13781 0
 13778  13779 -13780  336 -13782 0
 13778  13779 -13780  336 -13783 0

c  0-1 --> -1
c    (-b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧ -p_336) -> ( b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0)
c  in CNF:
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨  b^{21, 17}_2
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_1
c     b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨  b^{21, 17}_0
c  in DIMACS:
 13778  13779  13780  336  13781 0
 13778  13779  13780  336 -13782 0
 13778  13779  13780  336  13783 0

c  -1-1 --> -2
c    ( b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧  b^{21, 16}_0 ∧ -p_336) -> ( b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0)
c  in CNF:
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨  b^{21, 17}_2
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨  b^{21, 17}_1
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨  p_336 ∨ -b^{21, 17}_0
c  in DIMACS:
-13778  13779 -13780  336  13781 0
-13778  13779 -13780  336  13782 0
-13778  13779 -13780  336 -13783 0

c  -2-1 --> break 
c    ( b^{21, 16}_2 ∧  b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨  b^{21, 16}_0 ∨  p_336 ∨ break
c  in DIMACS:
-13778 -13779  13780  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 16}_2 ∧ -b^{21, 16}_1 ∧ -b^{21, 16}_0 ∧ true) 
c  in CNF:
c    -b^{21, 16}_2 ∨  b^{21, 16}_1 ∨  b^{21, 16}_0 ∨ false 
c  in DIMACS:
-13778  13779  13780  0

c  3 does not represent an automaton state.
c    -(-b^{21, 16}_2 ∧  b^{21, 16}_1 ∧  b^{21, 16}_0 ∧ true) 
c  in CNF:
c     b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ false 
c  in DIMACS:
 13778 -13779 -13780  0
c  -3 does not represent an automaton state.
c    -( b^{21, 16}_2 ∧  b^{21, 16}_1 ∧  b^{21, 16}_0 ∧ true) 
c  in CNF:
c    -b^{21, 16}_2 ∨ -b^{21, 16}_1 ∨ -b^{21, 16}_0 ∨ false 
c  in DIMACS:
-13778 -13779 -13780  0

c i = 17
c  -2+1 --> -1
c    ( b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧  p_357) -> ( b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0)
c  in CNF:
c    -b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨  b^{21, 18}_2
c    -b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_1
c    -b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨  b^{21, 18}_0
c  in DIMACS:
-13781 -13782  13783 -357  13784 0
-13781 -13782  13783 -357 -13785 0
-13781 -13782  13783 -357  13786 0

c  -1+1 --> 0
c    ( b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0 ∧  p_357) -> (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧ -b^{21, 18}_0)
c  in CNF:
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_2
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_1
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_0
c  in DIMACS:
-13781  13782 -13783 -357 -13784 0
-13781  13782 -13783 -357 -13785 0
-13781  13782 -13783 -357 -13786 0

c  0+1 --> 1
c    (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧  p_357) -> (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0)
c  in CNF:
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_2
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_1
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨  b^{21, 18}_0
c  in DIMACS:
 13781  13782  13783 -357 -13784 0
 13781  13782  13783 -357 -13785 0
 13781  13782  13783 -357  13786 0

c  1+1 --> 2
c    (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0 ∧  p_357) -> (-b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0)
c  in CNF:
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_2
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨  b^{21, 18}_1
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ -p_357 ∨ -b^{21, 18}_0
c  in DIMACS:
 13781  13782 -13783 -357 -13784 0
 13781  13782 -13783 -357  13785 0
 13781  13782 -13783 -357 -13786 0

c  2+1 --> break 
c    (-b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧  p_357) -> break
c  in CNF:
c     b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 13781 -13782  13783 -357 1162 0


c  2-1 --> 1
c    (-b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧ -p_357) -> (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0)
c  in CNF:
c     b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_2
c     b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_1
c     b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨  b^{21, 18}_0
c  in DIMACS:
 13781 -13782  13783  357 -13784 0
 13781 -13782  13783  357 -13785 0
 13781 -13782  13783  357  13786 0

c  1-1 --> 0
c    (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0 ∧ -p_357) -> (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧ -b^{21, 18}_0)
c  in CNF:
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_2
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_1
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_0
c  in DIMACS:
 13781  13782 -13783  357 -13784 0
 13781  13782 -13783  357 -13785 0
 13781  13782 -13783  357 -13786 0

c  0-1 --> -1
c    (-b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧ -p_357) -> ( b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0)
c  in CNF:
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨  b^{21, 18}_2
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_1
c     b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨  b^{21, 18}_0
c  in DIMACS:
 13781  13782  13783  357  13784 0
 13781  13782  13783  357 -13785 0
 13781  13782  13783  357  13786 0

c  -1-1 --> -2
c    ( b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧  b^{21, 17}_0 ∧ -p_357) -> ( b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0)
c  in CNF:
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨  b^{21, 18}_2
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨  b^{21, 18}_1
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨  p_357 ∨ -b^{21, 18}_0
c  in DIMACS:
-13781  13782 -13783  357  13784 0
-13781  13782 -13783  357  13785 0
-13781  13782 -13783  357 -13786 0

c  -2-1 --> break 
c    ( b^{21, 17}_2 ∧  b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨  b^{21, 17}_0 ∨  p_357 ∨ break
c  in DIMACS:
-13781 -13782  13783  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 17}_2 ∧ -b^{21, 17}_1 ∧ -b^{21, 17}_0 ∧ true) 
c  in CNF:
c    -b^{21, 17}_2 ∨  b^{21, 17}_1 ∨  b^{21, 17}_0 ∨ false 
c  in DIMACS:
-13781  13782  13783  0

c  3 does not represent an automaton state.
c    -(-b^{21, 17}_2 ∧  b^{21, 17}_1 ∧  b^{21, 17}_0 ∧ true) 
c  in CNF:
c     b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ false 
c  in DIMACS:
 13781 -13782 -13783  0
c  -3 does not represent an automaton state.
c    -( b^{21, 17}_2 ∧  b^{21, 17}_1 ∧  b^{21, 17}_0 ∧ true) 
c  in CNF:
c    -b^{21, 17}_2 ∨ -b^{21, 17}_1 ∨ -b^{21, 17}_0 ∨ false 
c  in DIMACS:
-13781 -13782 -13783  0

c i = 18
c  -2+1 --> -1
c    ( b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧  p_378) -> ( b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0)
c  in CNF:
c    -b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨  b^{21, 19}_2
c    -b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_1
c    -b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨  b^{21, 19}_0
c  in DIMACS:
-13784 -13785  13786 -378  13787 0
-13784 -13785  13786 -378 -13788 0
-13784 -13785  13786 -378  13789 0

c  -1+1 --> 0
c    ( b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0 ∧  p_378) -> (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧ -b^{21, 19}_0)
c  in CNF:
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_2
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_1
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_0
c  in DIMACS:
-13784  13785 -13786 -378 -13787 0
-13784  13785 -13786 -378 -13788 0
-13784  13785 -13786 -378 -13789 0

c  0+1 --> 1
c    (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧  p_378) -> (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0)
c  in CNF:
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_2
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_1
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨  b^{21, 19}_0
c  in DIMACS:
 13784  13785  13786 -378 -13787 0
 13784  13785  13786 -378 -13788 0
 13784  13785  13786 -378  13789 0

c  1+1 --> 2
c    (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0 ∧  p_378) -> (-b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0)
c  in CNF:
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_2
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨  b^{21, 19}_1
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ -p_378 ∨ -b^{21, 19}_0
c  in DIMACS:
 13784  13785 -13786 -378 -13787 0
 13784  13785 -13786 -378  13788 0
 13784  13785 -13786 -378 -13789 0

c  2+1 --> break 
c    (-b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧  p_378) -> break
c  in CNF:
c     b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 13784 -13785  13786 -378 1162 0


c  2-1 --> 1
c    (-b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧ -p_378) -> (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0)
c  in CNF:
c     b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_2
c     b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_1
c     b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨  b^{21, 19}_0
c  in DIMACS:
 13784 -13785  13786  378 -13787 0
 13784 -13785  13786  378 -13788 0
 13784 -13785  13786  378  13789 0

c  1-1 --> 0
c    (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0 ∧ -p_378) -> (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧ -b^{21, 19}_0)
c  in CNF:
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_2
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_1
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_0
c  in DIMACS:
 13784  13785 -13786  378 -13787 0
 13784  13785 -13786  378 -13788 0
 13784  13785 -13786  378 -13789 0

c  0-1 --> -1
c    (-b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧ -p_378) -> ( b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0)
c  in CNF:
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨  b^{21, 19}_2
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_1
c     b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨  b^{21, 19}_0
c  in DIMACS:
 13784  13785  13786  378  13787 0
 13784  13785  13786  378 -13788 0
 13784  13785  13786  378  13789 0

c  -1-1 --> -2
c    ( b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧  b^{21, 18}_0 ∧ -p_378) -> ( b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0)
c  in CNF:
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨  b^{21, 19}_2
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨  b^{21, 19}_1
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨  p_378 ∨ -b^{21, 19}_0
c  in DIMACS:
-13784  13785 -13786  378  13787 0
-13784  13785 -13786  378  13788 0
-13784  13785 -13786  378 -13789 0

c  -2-1 --> break 
c    ( b^{21, 18}_2 ∧  b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨  b^{21, 18}_0 ∨  p_378 ∨ break
c  in DIMACS:
-13784 -13785  13786  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 18}_2 ∧ -b^{21, 18}_1 ∧ -b^{21, 18}_0 ∧ true) 
c  in CNF:
c    -b^{21, 18}_2 ∨  b^{21, 18}_1 ∨  b^{21, 18}_0 ∨ false 
c  in DIMACS:
-13784  13785  13786  0

c  3 does not represent an automaton state.
c    -(-b^{21, 18}_2 ∧  b^{21, 18}_1 ∧  b^{21, 18}_0 ∧ true) 
c  in CNF:
c     b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ false 
c  in DIMACS:
 13784 -13785 -13786  0
c  -3 does not represent an automaton state.
c    -( b^{21, 18}_2 ∧  b^{21, 18}_1 ∧  b^{21, 18}_0 ∧ true) 
c  in CNF:
c    -b^{21, 18}_2 ∨ -b^{21, 18}_1 ∨ -b^{21, 18}_0 ∨ false 
c  in DIMACS:
-13784 -13785 -13786  0

c i = 19
c  -2+1 --> -1
c    ( b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧  p_399) -> ( b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0)
c  in CNF:
c    -b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨  b^{21, 20}_2
c    -b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_1
c    -b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨  b^{21, 20}_0
c  in DIMACS:
-13787 -13788  13789 -399  13790 0
-13787 -13788  13789 -399 -13791 0
-13787 -13788  13789 -399  13792 0

c  -1+1 --> 0
c    ( b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0 ∧  p_399) -> (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧ -b^{21, 20}_0)
c  in CNF:
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_2
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_1
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_0
c  in DIMACS:
-13787  13788 -13789 -399 -13790 0
-13787  13788 -13789 -399 -13791 0
-13787  13788 -13789 -399 -13792 0

c  0+1 --> 1
c    (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧  p_399) -> (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0)
c  in CNF:
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_2
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_1
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨  b^{21, 20}_0
c  in DIMACS:
 13787  13788  13789 -399 -13790 0
 13787  13788  13789 -399 -13791 0
 13787  13788  13789 -399  13792 0

c  1+1 --> 2
c    (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0 ∧  p_399) -> (-b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0)
c  in CNF:
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_2
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨  b^{21, 20}_1
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ -p_399 ∨ -b^{21, 20}_0
c  in DIMACS:
 13787  13788 -13789 -399 -13790 0
 13787  13788 -13789 -399  13791 0
 13787  13788 -13789 -399 -13792 0

c  2+1 --> break 
c    (-b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧  p_399) -> break
c  in CNF:
c     b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 13787 -13788  13789 -399 1162 0


c  2-1 --> 1
c    (-b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧ -p_399) -> (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0)
c  in CNF:
c     b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_2
c     b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_1
c     b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨  b^{21, 20}_0
c  in DIMACS:
 13787 -13788  13789  399 -13790 0
 13787 -13788  13789  399 -13791 0
 13787 -13788  13789  399  13792 0

c  1-1 --> 0
c    (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0 ∧ -p_399) -> (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧ -b^{21, 20}_0)
c  in CNF:
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_2
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_1
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_0
c  in DIMACS:
 13787  13788 -13789  399 -13790 0
 13787  13788 -13789  399 -13791 0
 13787  13788 -13789  399 -13792 0

c  0-1 --> -1
c    (-b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧ -p_399) -> ( b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0)
c  in CNF:
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨  b^{21, 20}_2
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_1
c     b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨  b^{21, 20}_0
c  in DIMACS:
 13787  13788  13789  399  13790 0
 13787  13788  13789  399 -13791 0
 13787  13788  13789  399  13792 0

c  -1-1 --> -2
c    ( b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧  b^{21, 19}_0 ∧ -p_399) -> ( b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0)
c  in CNF:
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨  b^{21, 20}_2
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨  b^{21, 20}_1
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨  p_399 ∨ -b^{21, 20}_0
c  in DIMACS:
-13787  13788 -13789  399  13790 0
-13787  13788 -13789  399  13791 0
-13787  13788 -13789  399 -13792 0

c  -2-1 --> break 
c    ( b^{21, 19}_2 ∧  b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨  b^{21, 19}_0 ∨  p_399 ∨ break
c  in DIMACS:
-13787 -13788  13789  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 19}_2 ∧ -b^{21, 19}_1 ∧ -b^{21, 19}_0 ∧ true) 
c  in CNF:
c    -b^{21, 19}_2 ∨  b^{21, 19}_1 ∨  b^{21, 19}_0 ∨ false 
c  in DIMACS:
-13787  13788  13789  0

c  3 does not represent an automaton state.
c    -(-b^{21, 19}_2 ∧  b^{21, 19}_1 ∧  b^{21, 19}_0 ∧ true) 
c  in CNF:
c     b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ false 
c  in DIMACS:
 13787 -13788 -13789  0
c  -3 does not represent an automaton state.
c    -( b^{21, 19}_2 ∧  b^{21, 19}_1 ∧  b^{21, 19}_0 ∧ true) 
c  in CNF:
c    -b^{21, 19}_2 ∨ -b^{21, 19}_1 ∨ -b^{21, 19}_0 ∨ false 
c  in DIMACS:
-13787 -13788 -13789  0

c i = 20
c  -2+1 --> -1
c    ( b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧  p_420) -> ( b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0)
c  in CNF:
c    -b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨  b^{21, 21}_2
c    -b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_1
c    -b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨  b^{21, 21}_0
c  in DIMACS:
-13790 -13791  13792 -420  13793 0
-13790 -13791  13792 -420 -13794 0
-13790 -13791  13792 -420  13795 0

c  -1+1 --> 0
c    ( b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0 ∧  p_420) -> (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧ -b^{21, 21}_0)
c  in CNF:
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_2
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_1
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_0
c  in DIMACS:
-13790  13791 -13792 -420 -13793 0
-13790  13791 -13792 -420 -13794 0
-13790  13791 -13792 -420 -13795 0

c  0+1 --> 1
c    (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧  p_420) -> (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0)
c  in CNF:
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_2
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_1
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨  b^{21, 21}_0
c  in DIMACS:
 13790  13791  13792 -420 -13793 0
 13790  13791  13792 -420 -13794 0
 13790  13791  13792 -420  13795 0

c  1+1 --> 2
c    (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0 ∧  p_420) -> (-b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0)
c  in CNF:
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_2
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨  b^{21, 21}_1
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ -p_420 ∨ -b^{21, 21}_0
c  in DIMACS:
 13790  13791 -13792 -420 -13793 0
 13790  13791 -13792 -420  13794 0
 13790  13791 -13792 -420 -13795 0

c  2+1 --> break 
c    (-b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧  p_420) -> break
c  in CNF:
c     b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 13790 -13791  13792 -420 1162 0


c  2-1 --> 1
c    (-b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧ -p_420) -> (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0)
c  in CNF:
c     b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_2
c     b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_1
c     b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨  b^{21, 21}_0
c  in DIMACS:
 13790 -13791  13792  420 -13793 0
 13790 -13791  13792  420 -13794 0
 13790 -13791  13792  420  13795 0

c  1-1 --> 0
c    (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0 ∧ -p_420) -> (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧ -b^{21, 21}_0)
c  in CNF:
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_2
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_1
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_0
c  in DIMACS:
 13790  13791 -13792  420 -13793 0
 13790  13791 -13792  420 -13794 0
 13790  13791 -13792  420 -13795 0

c  0-1 --> -1
c    (-b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧ -p_420) -> ( b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0)
c  in CNF:
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨  b^{21, 21}_2
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_1
c     b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨  b^{21, 21}_0
c  in DIMACS:
 13790  13791  13792  420  13793 0
 13790  13791  13792  420 -13794 0
 13790  13791  13792  420  13795 0

c  -1-1 --> -2
c    ( b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧  b^{21, 20}_0 ∧ -p_420) -> ( b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0)
c  in CNF:
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨  b^{21, 21}_2
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨  b^{21, 21}_1
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨  p_420 ∨ -b^{21, 21}_0
c  in DIMACS:
-13790  13791 -13792  420  13793 0
-13790  13791 -13792  420  13794 0
-13790  13791 -13792  420 -13795 0

c  -2-1 --> break 
c    ( b^{21, 20}_2 ∧  b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨  b^{21, 20}_0 ∨  p_420 ∨ break
c  in DIMACS:
-13790 -13791  13792  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 20}_2 ∧ -b^{21, 20}_1 ∧ -b^{21, 20}_0 ∧ true) 
c  in CNF:
c    -b^{21, 20}_2 ∨  b^{21, 20}_1 ∨  b^{21, 20}_0 ∨ false 
c  in DIMACS:
-13790  13791  13792  0

c  3 does not represent an automaton state.
c    -(-b^{21, 20}_2 ∧  b^{21, 20}_1 ∧  b^{21, 20}_0 ∧ true) 
c  in CNF:
c     b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ false 
c  in DIMACS:
 13790 -13791 -13792  0
c  -3 does not represent an automaton state.
c    -( b^{21, 20}_2 ∧  b^{21, 20}_1 ∧  b^{21, 20}_0 ∧ true) 
c  in CNF:
c    -b^{21, 20}_2 ∨ -b^{21, 20}_1 ∨ -b^{21, 20}_0 ∨ false 
c  in DIMACS:
-13790 -13791 -13792  0

c i = 21
c  -2+1 --> -1
c    ( b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧  p_441) -> ( b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0)
c  in CNF:
c    -b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨  b^{21, 22}_2
c    -b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_1
c    -b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨  b^{21, 22}_0
c  in DIMACS:
-13793 -13794  13795 -441  13796 0
-13793 -13794  13795 -441 -13797 0
-13793 -13794  13795 -441  13798 0

c  -1+1 --> 0
c    ( b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0 ∧  p_441) -> (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧ -b^{21, 22}_0)
c  in CNF:
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_2
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_1
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_0
c  in DIMACS:
-13793  13794 -13795 -441 -13796 0
-13793  13794 -13795 -441 -13797 0
-13793  13794 -13795 -441 -13798 0

c  0+1 --> 1
c    (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧  p_441) -> (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0)
c  in CNF:
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_2
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_1
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨  b^{21, 22}_0
c  in DIMACS:
 13793  13794  13795 -441 -13796 0
 13793  13794  13795 -441 -13797 0
 13793  13794  13795 -441  13798 0

c  1+1 --> 2
c    (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0 ∧  p_441) -> (-b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0)
c  in CNF:
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_2
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨  b^{21, 22}_1
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ -p_441 ∨ -b^{21, 22}_0
c  in DIMACS:
 13793  13794 -13795 -441 -13796 0
 13793  13794 -13795 -441  13797 0
 13793  13794 -13795 -441 -13798 0

c  2+1 --> break 
c    (-b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧  p_441) -> break
c  in CNF:
c     b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 13793 -13794  13795 -441 1162 0


c  2-1 --> 1
c    (-b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧ -p_441) -> (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0)
c  in CNF:
c     b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_2
c     b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_1
c     b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨  b^{21, 22}_0
c  in DIMACS:
 13793 -13794  13795  441 -13796 0
 13793 -13794  13795  441 -13797 0
 13793 -13794  13795  441  13798 0

c  1-1 --> 0
c    (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0 ∧ -p_441) -> (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧ -b^{21, 22}_0)
c  in CNF:
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_2
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_1
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_0
c  in DIMACS:
 13793  13794 -13795  441 -13796 0
 13793  13794 -13795  441 -13797 0
 13793  13794 -13795  441 -13798 0

c  0-1 --> -1
c    (-b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧ -p_441) -> ( b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0)
c  in CNF:
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨  b^{21, 22}_2
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_1
c     b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨  b^{21, 22}_0
c  in DIMACS:
 13793  13794  13795  441  13796 0
 13793  13794  13795  441 -13797 0
 13793  13794  13795  441  13798 0

c  -1-1 --> -2
c    ( b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧  b^{21, 21}_0 ∧ -p_441) -> ( b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0)
c  in CNF:
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨  b^{21, 22}_2
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨  b^{21, 22}_1
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨  p_441 ∨ -b^{21, 22}_0
c  in DIMACS:
-13793  13794 -13795  441  13796 0
-13793  13794 -13795  441  13797 0
-13793  13794 -13795  441 -13798 0

c  -2-1 --> break 
c    ( b^{21, 21}_2 ∧  b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨  b^{21, 21}_0 ∨  p_441 ∨ break
c  in DIMACS:
-13793 -13794  13795  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 21}_2 ∧ -b^{21, 21}_1 ∧ -b^{21, 21}_0 ∧ true) 
c  in CNF:
c    -b^{21, 21}_2 ∨  b^{21, 21}_1 ∨  b^{21, 21}_0 ∨ false 
c  in DIMACS:
-13793  13794  13795  0

c  3 does not represent an automaton state.
c    -(-b^{21, 21}_2 ∧  b^{21, 21}_1 ∧  b^{21, 21}_0 ∧ true) 
c  in CNF:
c     b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ false 
c  in DIMACS:
 13793 -13794 -13795  0
c  -3 does not represent an automaton state.
c    -( b^{21, 21}_2 ∧  b^{21, 21}_1 ∧  b^{21, 21}_0 ∧ true) 
c  in CNF:
c    -b^{21, 21}_2 ∨ -b^{21, 21}_1 ∨ -b^{21, 21}_0 ∨ false 
c  in DIMACS:
-13793 -13794 -13795  0

c i = 22
c  -2+1 --> -1
c    ( b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧  p_462) -> ( b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0)
c  in CNF:
c    -b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨  b^{21, 23}_2
c    -b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_1
c    -b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨  b^{21, 23}_0
c  in DIMACS:
-13796 -13797  13798 -462  13799 0
-13796 -13797  13798 -462 -13800 0
-13796 -13797  13798 -462  13801 0

c  -1+1 --> 0
c    ( b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0 ∧  p_462) -> (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧ -b^{21, 23}_0)
c  in CNF:
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_2
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_1
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_0
c  in DIMACS:
-13796  13797 -13798 -462 -13799 0
-13796  13797 -13798 -462 -13800 0
-13796  13797 -13798 -462 -13801 0

c  0+1 --> 1
c    (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧  p_462) -> (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0)
c  in CNF:
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_2
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_1
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨  b^{21, 23}_0
c  in DIMACS:
 13796  13797  13798 -462 -13799 0
 13796  13797  13798 -462 -13800 0
 13796  13797  13798 -462  13801 0

c  1+1 --> 2
c    (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0 ∧  p_462) -> (-b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0)
c  in CNF:
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_2
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨  b^{21, 23}_1
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ -p_462 ∨ -b^{21, 23}_0
c  in DIMACS:
 13796  13797 -13798 -462 -13799 0
 13796  13797 -13798 -462  13800 0
 13796  13797 -13798 -462 -13801 0

c  2+1 --> break 
c    (-b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧  p_462) -> break
c  in CNF:
c     b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 13796 -13797  13798 -462 1162 0


c  2-1 --> 1
c    (-b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧ -p_462) -> (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0)
c  in CNF:
c     b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_2
c     b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_1
c     b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨  b^{21, 23}_0
c  in DIMACS:
 13796 -13797  13798  462 -13799 0
 13796 -13797  13798  462 -13800 0
 13796 -13797  13798  462  13801 0

c  1-1 --> 0
c    (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0 ∧ -p_462) -> (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧ -b^{21, 23}_0)
c  in CNF:
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_2
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_1
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_0
c  in DIMACS:
 13796  13797 -13798  462 -13799 0
 13796  13797 -13798  462 -13800 0
 13796  13797 -13798  462 -13801 0

c  0-1 --> -1
c    (-b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧ -p_462) -> ( b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0)
c  in CNF:
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨  b^{21, 23}_2
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_1
c     b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨  b^{21, 23}_0
c  in DIMACS:
 13796  13797  13798  462  13799 0
 13796  13797  13798  462 -13800 0
 13796  13797  13798  462  13801 0

c  -1-1 --> -2
c    ( b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧  b^{21, 22}_0 ∧ -p_462) -> ( b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0)
c  in CNF:
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨  b^{21, 23}_2
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨  b^{21, 23}_1
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨  p_462 ∨ -b^{21, 23}_0
c  in DIMACS:
-13796  13797 -13798  462  13799 0
-13796  13797 -13798  462  13800 0
-13796  13797 -13798  462 -13801 0

c  -2-1 --> break 
c    ( b^{21, 22}_2 ∧  b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨  b^{21, 22}_0 ∨  p_462 ∨ break
c  in DIMACS:
-13796 -13797  13798  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 22}_2 ∧ -b^{21, 22}_1 ∧ -b^{21, 22}_0 ∧ true) 
c  in CNF:
c    -b^{21, 22}_2 ∨  b^{21, 22}_1 ∨  b^{21, 22}_0 ∨ false 
c  in DIMACS:
-13796  13797  13798  0

c  3 does not represent an automaton state.
c    -(-b^{21, 22}_2 ∧  b^{21, 22}_1 ∧  b^{21, 22}_0 ∧ true) 
c  in CNF:
c     b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ false 
c  in DIMACS:
 13796 -13797 -13798  0
c  -3 does not represent an automaton state.
c    -( b^{21, 22}_2 ∧  b^{21, 22}_1 ∧  b^{21, 22}_0 ∧ true) 
c  in CNF:
c    -b^{21, 22}_2 ∨ -b^{21, 22}_1 ∨ -b^{21, 22}_0 ∨ false 
c  in DIMACS:
-13796 -13797 -13798  0

c i = 23
c  -2+1 --> -1
c    ( b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧  p_483) -> ( b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0)
c  in CNF:
c    -b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨  b^{21, 24}_2
c    -b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_1
c    -b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨  b^{21, 24}_0
c  in DIMACS:
-13799 -13800  13801 -483  13802 0
-13799 -13800  13801 -483 -13803 0
-13799 -13800  13801 -483  13804 0

c  -1+1 --> 0
c    ( b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0 ∧  p_483) -> (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧ -b^{21, 24}_0)
c  in CNF:
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_2
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_1
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_0
c  in DIMACS:
-13799  13800 -13801 -483 -13802 0
-13799  13800 -13801 -483 -13803 0
-13799  13800 -13801 -483 -13804 0

c  0+1 --> 1
c    (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧  p_483) -> (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0)
c  in CNF:
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_2
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_1
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨  b^{21, 24}_0
c  in DIMACS:
 13799  13800  13801 -483 -13802 0
 13799  13800  13801 -483 -13803 0
 13799  13800  13801 -483  13804 0

c  1+1 --> 2
c    (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0 ∧  p_483) -> (-b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0)
c  in CNF:
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_2
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨  b^{21, 24}_1
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ -p_483 ∨ -b^{21, 24}_0
c  in DIMACS:
 13799  13800 -13801 -483 -13802 0
 13799  13800 -13801 -483  13803 0
 13799  13800 -13801 -483 -13804 0

c  2+1 --> break 
c    (-b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧  p_483) -> break
c  in CNF:
c     b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 13799 -13800  13801 -483 1162 0


c  2-1 --> 1
c    (-b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧ -p_483) -> (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0)
c  in CNF:
c     b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_2
c     b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_1
c     b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨  b^{21, 24}_0
c  in DIMACS:
 13799 -13800  13801  483 -13802 0
 13799 -13800  13801  483 -13803 0
 13799 -13800  13801  483  13804 0

c  1-1 --> 0
c    (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0 ∧ -p_483) -> (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧ -b^{21, 24}_0)
c  in CNF:
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_2
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_1
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_0
c  in DIMACS:
 13799  13800 -13801  483 -13802 0
 13799  13800 -13801  483 -13803 0
 13799  13800 -13801  483 -13804 0

c  0-1 --> -1
c    (-b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧ -p_483) -> ( b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0)
c  in CNF:
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨  b^{21, 24}_2
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_1
c     b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨  b^{21, 24}_0
c  in DIMACS:
 13799  13800  13801  483  13802 0
 13799  13800  13801  483 -13803 0
 13799  13800  13801  483  13804 0

c  -1-1 --> -2
c    ( b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧  b^{21, 23}_0 ∧ -p_483) -> ( b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0)
c  in CNF:
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨  b^{21, 24}_2
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨  b^{21, 24}_1
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨  p_483 ∨ -b^{21, 24}_0
c  in DIMACS:
-13799  13800 -13801  483  13802 0
-13799  13800 -13801  483  13803 0
-13799  13800 -13801  483 -13804 0

c  -2-1 --> break 
c    ( b^{21, 23}_2 ∧  b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨  b^{21, 23}_0 ∨  p_483 ∨ break
c  in DIMACS:
-13799 -13800  13801  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 23}_2 ∧ -b^{21, 23}_1 ∧ -b^{21, 23}_0 ∧ true) 
c  in CNF:
c    -b^{21, 23}_2 ∨  b^{21, 23}_1 ∨  b^{21, 23}_0 ∨ false 
c  in DIMACS:
-13799  13800  13801  0

c  3 does not represent an automaton state.
c    -(-b^{21, 23}_2 ∧  b^{21, 23}_1 ∧  b^{21, 23}_0 ∧ true) 
c  in CNF:
c     b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ false 
c  in DIMACS:
 13799 -13800 -13801  0
c  -3 does not represent an automaton state.
c    -( b^{21, 23}_2 ∧  b^{21, 23}_1 ∧  b^{21, 23}_0 ∧ true) 
c  in CNF:
c    -b^{21, 23}_2 ∨ -b^{21, 23}_1 ∨ -b^{21, 23}_0 ∨ false 
c  in DIMACS:
-13799 -13800 -13801  0

c i = 24
c  -2+1 --> -1
c    ( b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧  p_504) -> ( b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0)
c  in CNF:
c    -b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨  b^{21, 25}_2
c    -b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_1
c    -b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨  b^{21, 25}_0
c  in DIMACS:
-13802 -13803  13804 -504  13805 0
-13802 -13803  13804 -504 -13806 0
-13802 -13803  13804 -504  13807 0

c  -1+1 --> 0
c    ( b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0 ∧  p_504) -> (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧ -b^{21, 25}_0)
c  in CNF:
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_2
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_1
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_0
c  in DIMACS:
-13802  13803 -13804 -504 -13805 0
-13802  13803 -13804 -504 -13806 0
-13802  13803 -13804 -504 -13807 0

c  0+1 --> 1
c    (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧  p_504) -> (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0)
c  in CNF:
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_2
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_1
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨  b^{21, 25}_0
c  in DIMACS:
 13802  13803  13804 -504 -13805 0
 13802  13803  13804 -504 -13806 0
 13802  13803  13804 -504  13807 0

c  1+1 --> 2
c    (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0 ∧  p_504) -> (-b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0)
c  in CNF:
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_2
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨  b^{21, 25}_1
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ -p_504 ∨ -b^{21, 25}_0
c  in DIMACS:
 13802  13803 -13804 -504 -13805 0
 13802  13803 -13804 -504  13806 0
 13802  13803 -13804 -504 -13807 0

c  2+1 --> break 
c    (-b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧  p_504) -> break
c  in CNF:
c     b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 13802 -13803  13804 -504 1162 0


c  2-1 --> 1
c    (-b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧ -p_504) -> (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0)
c  in CNF:
c     b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_2
c     b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_1
c     b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨  b^{21, 25}_0
c  in DIMACS:
 13802 -13803  13804  504 -13805 0
 13802 -13803  13804  504 -13806 0
 13802 -13803  13804  504  13807 0

c  1-1 --> 0
c    (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0 ∧ -p_504) -> (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧ -b^{21, 25}_0)
c  in CNF:
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_2
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_1
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_0
c  in DIMACS:
 13802  13803 -13804  504 -13805 0
 13802  13803 -13804  504 -13806 0
 13802  13803 -13804  504 -13807 0

c  0-1 --> -1
c    (-b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧ -p_504) -> ( b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0)
c  in CNF:
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨  b^{21, 25}_2
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_1
c     b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨  b^{21, 25}_0
c  in DIMACS:
 13802  13803  13804  504  13805 0
 13802  13803  13804  504 -13806 0
 13802  13803  13804  504  13807 0

c  -1-1 --> -2
c    ( b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧  b^{21, 24}_0 ∧ -p_504) -> ( b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0)
c  in CNF:
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨  b^{21, 25}_2
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨  b^{21, 25}_1
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨  p_504 ∨ -b^{21, 25}_0
c  in DIMACS:
-13802  13803 -13804  504  13805 0
-13802  13803 -13804  504  13806 0
-13802  13803 -13804  504 -13807 0

c  -2-1 --> break 
c    ( b^{21, 24}_2 ∧  b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨  b^{21, 24}_0 ∨  p_504 ∨ break
c  in DIMACS:
-13802 -13803  13804  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 24}_2 ∧ -b^{21, 24}_1 ∧ -b^{21, 24}_0 ∧ true) 
c  in CNF:
c    -b^{21, 24}_2 ∨  b^{21, 24}_1 ∨  b^{21, 24}_0 ∨ false 
c  in DIMACS:
-13802  13803  13804  0

c  3 does not represent an automaton state.
c    -(-b^{21, 24}_2 ∧  b^{21, 24}_1 ∧  b^{21, 24}_0 ∧ true) 
c  in CNF:
c     b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ false 
c  in DIMACS:
 13802 -13803 -13804  0
c  -3 does not represent an automaton state.
c    -( b^{21, 24}_2 ∧  b^{21, 24}_1 ∧  b^{21, 24}_0 ∧ true) 
c  in CNF:
c    -b^{21, 24}_2 ∨ -b^{21, 24}_1 ∨ -b^{21, 24}_0 ∨ false 
c  in DIMACS:
-13802 -13803 -13804  0

c i = 25
c  -2+1 --> -1
c    ( b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧  p_525) -> ( b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0)
c  in CNF:
c    -b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨  b^{21, 26}_2
c    -b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_1
c    -b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨  b^{21, 26}_0
c  in DIMACS:
-13805 -13806  13807 -525  13808 0
-13805 -13806  13807 -525 -13809 0
-13805 -13806  13807 -525  13810 0

c  -1+1 --> 0
c    ( b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0 ∧  p_525) -> (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧ -b^{21, 26}_0)
c  in CNF:
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_2
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_1
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_0
c  in DIMACS:
-13805  13806 -13807 -525 -13808 0
-13805  13806 -13807 -525 -13809 0
-13805  13806 -13807 -525 -13810 0

c  0+1 --> 1
c    (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧  p_525) -> (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0)
c  in CNF:
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_2
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_1
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨  b^{21, 26}_0
c  in DIMACS:
 13805  13806  13807 -525 -13808 0
 13805  13806  13807 -525 -13809 0
 13805  13806  13807 -525  13810 0

c  1+1 --> 2
c    (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0 ∧  p_525) -> (-b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0)
c  in CNF:
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_2
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨  b^{21, 26}_1
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ -p_525 ∨ -b^{21, 26}_0
c  in DIMACS:
 13805  13806 -13807 -525 -13808 0
 13805  13806 -13807 -525  13809 0
 13805  13806 -13807 -525 -13810 0

c  2+1 --> break 
c    (-b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧  p_525) -> break
c  in CNF:
c     b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 13805 -13806  13807 -525 1162 0


c  2-1 --> 1
c    (-b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧ -p_525) -> (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0)
c  in CNF:
c     b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_2
c     b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_1
c     b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨  b^{21, 26}_0
c  in DIMACS:
 13805 -13806  13807  525 -13808 0
 13805 -13806  13807  525 -13809 0
 13805 -13806  13807  525  13810 0

c  1-1 --> 0
c    (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0 ∧ -p_525) -> (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧ -b^{21, 26}_0)
c  in CNF:
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_2
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_1
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_0
c  in DIMACS:
 13805  13806 -13807  525 -13808 0
 13805  13806 -13807  525 -13809 0
 13805  13806 -13807  525 -13810 0

c  0-1 --> -1
c    (-b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧ -p_525) -> ( b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0)
c  in CNF:
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨  b^{21, 26}_2
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_1
c     b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨  b^{21, 26}_0
c  in DIMACS:
 13805  13806  13807  525  13808 0
 13805  13806  13807  525 -13809 0
 13805  13806  13807  525  13810 0

c  -1-1 --> -2
c    ( b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧  b^{21, 25}_0 ∧ -p_525) -> ( b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0)
c  in CNF:
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨  b^{21, 26}_2
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨  b^{21, 26}_1
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨  p_525 ∨ -b^{21, 26}_0
c  in DIMACS:
-13805  13806 -13807  525  13808 0
-13805  13806 -13807  525  13809 0
-13805  13806 -13807  525 -13810 0

c  -2-1 --> break 
c    ( b^{21, 25}_2 ∧  b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨  b^{21, 25}_0 ∨  p_525 ∨ break
c  in DIMACS:
-13805 -13806  13807  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 25}_2 ∧ -b^{21, 25}_1 ∧ -b^{21, 25}_0 ∧ true) 
c  in CNF:
c    -b^{21, 25}_2 ∨  b^{21, 25}_1 ∨  b^{21, 25}_0 ∨ false 
c  in DIMACS:
-13805  13806  13807  0

c  3 does not represent an automaton state.
c    -(-b^{21, 25}_2 ∧  b^{21, 25}_1 ∧  b^{21, 25}_0 ∧ true) 
c  in CNF:
c     b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ false 
c  in DIMACS:
 13805 -13806 -13807  0
c  -3 does not represent an automaton state.
c    -( b^{21, 25}_2 ∧  b^{21, 25}_1 ∧  b^{21, 25}_0 ∧ true) 
c  in CNF:
c    -b^{21, 25}_2 ∨ -b^{21, 25}_1 ∨ -b^{21, 25}_0 ∨ false 
c  in DIMACS:
-13805 -13806 -13807  0

c i = 26
c  -2+1 --> -1
c    ( b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧  p_546) -> ( b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0)
c  in CNF:
c    -b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨  b^{21, 27}_2
c    -b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_1
c    -b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨  b^{21, 27}_0
c  in DIMACS:
-13808 -13809  13810 -546  13811 0
-13808 -13809  13810 -546 -13812 0
-13808 -13809  13810 -546  13813 0

c  -1+1 --> 0
c    ( b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0 ∧  p_546) -> (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧ -b^{21, 27}_0)
c  in CNF:
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_2
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_1
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_0
c  in DIMACS:
-13808  13809 -13810 -546 -13811 0
-13808  13809 -13810 -546 -13812 0
-13808  13809 -13810 -546 -13813 0

c  0+1 --> 1
c    (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧  p_546) -> (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0)
c  in CNF:
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_2
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_1
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨  b^{21, 27}_0
c  in DIMACS:
 13808  13809  13810 -546 -13811 0
 13808  13809  13810 -546 -13812 0
 13808  13809  13810 -546  13813 0

c  1+1 --> 2
c    (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0 ∧  p_546) -> (-b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0)
c  in CNF:
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_2
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨  b^{21, 27}_1
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ -p_546 ∨ -b^{21, 27}_0
c  in DIMACS:
 13808  13809 -13810 -546 -13811 0
 13808  13809 -13810 -546  13812 0
 13808  13809 -13810 -546 -13813 0

c  2+1 --> break 
c    (-b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧  p_546) -> break
c  in CNF:
c     b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 13808 -13809  13810 -546 1162 0


c  2-1 --> 1
c    (-b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧ -p_546) -> (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0)
c  in CNF:
c     b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_2
c     b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_1
c     b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨  b^{21, 27}_0
c  in DIMACS:
 13808 -13809  13810  546 -13811 0
 13808 -13809  13810  546 -13812 0
 13808 -13809  13810  546  13813 0

c  1-1 --> 0
c    (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0 ∧ -p_546) -> (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧ -b^{21, 27}_0)
c  in CNF:
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_2
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_1
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_0
c  in DIMACS:
 13808  13809 -13810  546 -13811 0
 13808  13809 -13810  546 -13812 0
 13808  13809 -13810  546 -13813 0

c  0-1 --> -1
c    (-b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧ -p_546) -> ( b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0)
c  in CNF:
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨  b^{21, 27}_2
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_1
c     b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨  b^{21, 27}_0
c  in DIMACS:
 13808  13809  13810  546  13811 0
 13808  13809  13810  546 -13812 0
 13808  13809  13810  546  13813 0

c  -1-1 --> -2
c    ( b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧  b^{21, 26}_0 ∧ -p_546) -> ( b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0)
c  in CNF:
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨  b^{21, 27}_2
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨  b^{21, 27}_1
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨  p_546 ∨ -b^{21, 27}_0
c  in DIMACS:
-13808  13809 -13810  546  13811 0
-13808  13809 -13810  546  13812 0
-13808  13809 -13810  546 -13813 0

c  -2-1 --> break 
c    ( b^{21, 26}_2 ∧  b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨  b^{21, 26}_0 ∨  p_546 ∨ break
c  in DIMACS:
-13808 -13809  13810  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 26}_2 ∧ -b^{21, 26}_1 ∧ -b^{21, 26}_0 ∧ true) 
c  in CNF:
c    -b^{21, 26}_2 ∨  b^{21, 26}_1 ∨  b^{21, 26}_0 ∨ false 
c  in DIMACS:
-13808  13809  13810  0

c  3 does not represent an automaton state.
c    -(-b^{21, 26}_2 ∧  b^{21, 26}_1 ∧  b^{21, 26}_0 ∧ true) 
c  in CNF:
c     b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ false 
c  in DIMACS:
 13808 -13809 -13810  0
c  -3 does not represent an automaton state.
c    -( b^{21, 26}_2 ∧  b^{21, 26}_1 ∧  b^{21, 26}_0 ∧ true) 
c  in CNF:
c    -b^{21, 26}_2 ∨ -b^{21, 26}_1 ∨ -b^{21, 26}_0 ∨ false 
c  in DIMACS:
-13808 -13809 -13810  0

c i = 27
c  -2+1 --> -1
c    ( b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧  p_567) -> ( b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0)
c  in CNF:
c    -b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨  b^{21, 28}_2
c    -b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_1
c    -b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨  b^{21, 28}_0
c  in DIMACS:
-13811 -13812  13813 -567  13814 0
-13811 -13812  13813 -567 -13815 0
-13811 -13812  13813 -567  13816 0

c  -1+1 --> 0
c    ( b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0 ∧  p_567) -> (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧ -b^{21, 28}_0)
c  in CNF:
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_2
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_1
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_0
c  in DIMACS:
-13811  13812 -13813 -567 -13814 0
-13811  13812 -13813 -567 -13815 0
-13811  13812 -13813 -567 -13816 0

c  0+1 --> 1
c    (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧  p_567) -> (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0)
c  in CNF:
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_2
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_1
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨  b^{21, 28}_0
c  in DIMACS:
 13811  13812  13813 -567 -13814 0
 13811  13812  13813 -567 -13815 0
 13811  13812  13813 -567  13816 0

c  1+1 --> 2
c    (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0 ∧  p_567) -> (-b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0)
c  in CNF:
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_2
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨  b^{21, 28}_1
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ -p_567 ∨ -b^{21, 28}_0
c  in DIMACS:
 13811  13812 -13813 -567 -13814 0
 13811  13812 -13813 -567  13815 0
 13811  13812 -13813 -567 -13816 0

c  2+1 --> break 
c    (-b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧  p_567) -> break
c  in CNF:
c     b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 13811 -13812  13813 -567 1162 0


c  2-1 --> 1
c    (-b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧ -p_567) -> (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0)
c  in CNF:
c     b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_2
c     b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_1
c     b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨  b^{21, 28}_0
c  in DIMACS:
 13811 -13812  13813  567 -13814 0
 13811 -13812  13813  567 -13815 0
 13811 -13812  13813  567  13816 0

c  1-1 --> 0
c    (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0 ∧ -p_567) -> (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧ -b^{21, 28}_0)
c  in CNF:
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_2
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_1
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_0
c  in DIMACS:
 13811  13812 -13813  567 -13814 0
 13811  13812 -13813  567 -13815 0
 13811  13812 -13813  567 -13816 0

c  0-1 --> -1
c    (-b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧ -p_567) -> ( b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0)
c  in CNF:
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨  b^{21, 28}_2
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_1
c     b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨  b^{21, 28}_0
c  in DIMACS:
 13811  13812  13813  567  13814 0
 13811  13812  13813  567 -13815 0
 13811  13812  13813  567  13816 0

c  -1-1 --> -2
c    ( b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧  b^{21, 27}_0 ∧ -p_567) -> ( b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0)
c  in CNF:
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨  b^{21, 28}_2
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨  b^{21, 28}_1
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨  p_567 ∨ -b^{21, 28}_0
c  in DIMACS:
-13811  13812 -13813  567  13814 0
-13811  13812 -13813  567  13815 0
-13811  13812 -13813  567 -13816 0

c  -2-1 --> break 
c    ( b^{21, 27}_2 ∧  b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨  b^{21, 27}_0 ∨  p_567 ∨ break
c  in DIMACS:
-13811 -13812  13813  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 27}_2 ∧ -b^{21, 27}_1 ∧ -b^{21, 27}_0 ∧ true) 
c  in CNF:
c    -b^{21, 27}_2 ∨  b^{21, 27}_1 ∨  b^{21, 27}_0 ∨ false 
c  in DIMACS:
-13811  13812  13813  0

c  3 does not represent an automaton state.
c    -(-b^{21, 27}_2 ∧  b^{21, 27}_1 ∧  b^{21, 27}_0 ∧ true) 
c  in CNF:
c     b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ false 
c  in DIMACS:
 13811 -13812 -13813  0
c  -3 does not represent an automaton state.
c    -( b^{21, 27}_2 ∧  b^{21, 27}_1 ∧  b^{21, 27}_0 ∧ true) 
c  in CNF:
c    -b^{21, 27}_2 ∨ -b^{21, 27}_1 ∨ -b^{21, 27}_0 ∨ false 
c  in DIMACS:
-13811 -13812 -13813  0

c i = 28
c  -2+1 --> -1
c    ( b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧  p_588) -> ( b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0)
c  in CNF:
c    -b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨  b^{21, 29}_2
c    -b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_1
c    -b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨  b^{21, 29}_0
c  in DIMACS:
-13814 -13815  13816 -588  13817 0
-13814 -13815  13816 -588 -13818 0
-13814 -13815  13816 -588  13819 0

c  -1+1 --> 0
c    ( b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0 ∧  p_588) -> (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧ -b^{21, 29}_0)
c  in CNF:
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_2
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_1
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_0
c  in DIMACS:
-13814  13815 -13816 -588 -13817 0
-13814  13815 -13816 -588 -13818 0
-13814  13815 -13816 -588 -13819 0

c  0+1 --> 1
c    (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧  p_588) -> (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0)
c  in CNF:
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_2
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_1
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨  b^{21, 29}_0
c  in DIMACS:
 13814  13815  13816 -588 -13817 0
 13814  13815  13816 -588 -13818 0
 13814  13815  13816 -588  13819 0

c  1+1 --> 2
c    (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0 ∧  p_588) -> (-b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0)
c  in CNF:
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_2
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨  b^{21, 29}_1
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ -p_588 ∨ -b^{21, 29}_0
c  in DIMACS:
 13814  13815 -13816 -588 -13817 0
 13814  13815 -13816 -588  13818 0
 13814  13815 -13816 -588 -13819 0

c  2+1 --> break 
c    (-b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧  p_588) -> break
c  in CNF:
c     b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 13814 -13815  13816 -588 1162 0


c  2-1 --> 1
c    (-b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧ -p_588) -> (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0)
c  in CNF:
c     b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_2
c     b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_1
c     b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨  b^{21, 29}_0
c  in DIMACS:
 13814 -13815  13816  588 -13817 0
 13814 -13815  13816  588 -13818 0
 13814 -13815  13816  588  13819 0

c  1-1 --> 0
c    (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0 ∧ -p_588) -> (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧ -b^{21, 29}_0)
c  in CNF:
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_2
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_1
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_0
c  in DIMACS:
 13814  13815 -13816  588 -13817 0
 13814  13815 -13816  588 -13818 0
 13814  13815 -13816  588 -13819 0

c  0-1 --> -1
c    (-b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧ -p_588) -> ( b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0)
c  in CNF:
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨  b^{21, 29}_2
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_1
c     b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨  b^{21, 29}_0
c  in DIMACS:
 13814  13815  13816  588  13817 0
 13814  13815  13816  588 -13818 0
 13814  13815  13816  588  13819 0

c  -1-1 --> -2
c    ( b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧  b^{21, 28}_0 ∧ -p_588) -> ( b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0)
c  in CNF:
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨  b^{21, 29}_2
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨  b^{21, 29}_1
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨  p_588 ∨ -b^{21, 29}_0
c  in DIMACS:
-13814  13815 -13816  588  13817 0
-13814  13815 -13816  588  13818 0
-13814  13815 -13816  588 -13819 0

c  -2-1 --> break 
c    ( b^{21, 28}_2 ∧  b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨  b^{21, 28}_0 ∨  p_588 ∨ break
c  in DIMACS:
-13814 -13815  13816  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 28}_2 ∧ -b^{21, 28}_1 ∧ -b^{21, 28}_0 ∧ true) 
c  in CNF:
c    -b^{21, 28}_2 ∨  b^{21, 28}_1 ∨  b^{21, 28}_0 ∨ false 
c  in DIMACS:
-13814  13815  13816  0

c  3 does not represent an automaton state.
c    -(-b^{21, 28}_2 ∧  b^{21, 28}_1 ∧  b^{21, 28}_0 ∧ true) 
c  in CNF:
c     b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ false 
c  in DIMACS:
 13814 -13815 -13816  0
c  -3 does not represent an automaton state.
c    -( b^{21, 28}_2 ∧  b^{21, 28}_1 ∧  b^{21, 28}_0 ∧ true) 
c  in CNF:
c    -b^{21, 28}_2 ∨ -b^{21, 28}_1 ∨ -b^{21, 28}_0 ∨ false 
c  in DIMACS:
-13814 -13815 -13816  0

c i = 29
c  -2+1 --> -1
c    ( b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧  p_609) -> ( b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0)
c  in CNF:
c    -b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨  b^{21, 30}_2
c    -b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_1
c    -b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨  b^{21, 30}_0
c  in DIMACS:
-13817 -13818  13819 -609  13820 0
-13817 -13818  13819 -609 -13821 0
-13817 -13818  13819 -609  13822 0

c  -1+1 --> 0
c    ( b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0 ∧  p_609) -> (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧ -b^{21, 30}_0)
c  in CNF:
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_2
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_1
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_0
c  in DIMACS:
-13817  13818 -13819 -609 -13820 0
-13817  13818 -13819 -609 -13821 0
-13817  13818 -13819 -609 -13822 0

c  0+1 --> 1
c    (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧  p_609) -> (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0)
c  in CNF:
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_2
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_1
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨  b^{21, 30}_0
c  in DIMACS:
 13817  13818  13819 -609 -13820 0
 13817  13818  13819 -609 -13821 0
 13817  13818  13819 -609  13822 0

c  1+1 --> 2
c    (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0 ∧  p_609) -> (-b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0)
c  in CNF:
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_2
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨  b^{21, 30}_1
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ -p_609 ∨ -b^{21, 30}_0
c  in DIMACS:
 13817  13818 -13819 -609 -13820 0
 13817  13818 -13819 -609  13821 0
 13817  13818 -13819 -609 -13822 0

c  2+1 --> break 
c    (-b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧  p_609) -> break
c  in CNF:
c     b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 13817 -13818  13819 -609 1162 0


c  2-1 --> 1
c    (-b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧ -p_609) -> (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0)
c  in CNF:
c     b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_2
c     b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_1
c     b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨  b^{21, 30}_0
c  in DIMACS:
 13817 -13818  13819  609 -13820 0
 13817 -13818  13819  609 -13821 0
 13817 -13818  13819  609  13822 0

c  1-1 --> 0
c    (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0 ∧ -p_609) -> (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧ -b^{21, 30}_0)
c  in CNF:
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_2
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_1
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_0
c  in DIMACS:
 13817  13818 -13819  609 -13820 0
 13817  13818 -13819  609 -13821 0
 13817  13818 -13819  609 -13822 0

c  0-1 --> -1
c    (-b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧ -p_609) -> ( b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0)
c  in CNF:
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨  b^{21, 30}_2
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_1
c     b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨  b^{21, 30}_0
c  in DIMACS:
 13817  13818  13819  609  13820 0
 13817  13818  13819  609 -13821 0
 13817  13818  13819  609  13822 0

c  -1-1 --> -2
c    ( b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧  b^{21, 29}_0 ∧ -p_609) -> ( b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0)
c  in CNF:
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨  b^{21, 30}_2
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨  b^{21, 30}_1
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨  p_609 ∨ -b^{21, 30}_0
c  in DIMACS:
-13817  13818 -13819  609  13820 0
-13817  13818 -13819  609  13821 0
-13817  13818 -13819  609 -13822 0

c  -2-1 --> break 
c    ( b^{21, 29}_2 ∧  b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨  b^{21, 29}_0 ∨  p_609 ∨ break
c  in DIMACS:
-13817 -13818  13819  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 29}_2 ∧ -b^{21, 29}_1 ∧ -b^{21, 29}_0 ∧ true) 
c  in CNF:
c    -b^{21, 29}_2 ∨  b^{21, 29}_1 ∨  b^{21, 29}_0 ∨ false 
c  in DIMACS:
-13817  13818  13819  0

c  3 does not represent an automaton state.
c    -(-b^{21, 29}_2 ∧  b^{21, 29}_1 ∧  b^{21, 29}_0 ∧ true) 
c  in CNF:
c     b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ false 
c  in DIMACS:
 13817 -13818 -13819  0
c  -3 does not represent an automaton state.
c    -( b^{21, 29}_2 ∧  b^{21, 29}_1 ∧  b^{21, 29}_0 ∧ true) 
c  in CNF:
c    -b^{21, 29}_2 ∨ -b^{21, 29}_1 ∨ -b^{21, 29}_0 ∨ false 
c  in DIMACS:
-13817 -13818 -13819  0

c i = 30
c  -2+1 --> -1
c    ( b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧  p_630) -> ( b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0)
c  in CNF:
c    -b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨  b^{21, 31}_2
c    -b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_1
c    -b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨  b^{21, 31}_0
c  in DIMACS:
-13820 -13821  13822 -630  13823 0
-13820 -13821  13822 -630 -13824 0
-13820 -13821  13822 -630  13825 0

c  -1+1 --> 0
c    ( b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0 ∧  p_630) -> (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧ -b^{21, 31}_0)
c  in CNF:
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_2
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_1
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_0
c  in DIMACS:
-13820  13821 -13822 -630 -13823 0
-13820  13821 -13822 -630 -13824 0
-13820  13821 -13822 -630 -13825 0

c  0+1 --> 1
c    (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧  p_630) -> (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0)
c  in CNF:
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_2
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_1
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨  b^{21, 31}_0
c  in DIMACS:
 13820  13821  13822 -630 -13823 0
 13820  13821  13822 -630 -13824 0
 13820  13821  13822 -630  13825 0

c  1+1 --> 2
c    (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0 ∧  p_630) -> (-b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0)
c  in CNF:
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_2
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨  b^{21, 31}_1
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ -p_630 ∨ -b^{21, 31}_0
c  in DIMACS:
 13820  13821 -13822 -630 -13823 0
 13820  13821 -13822 -630  13824 0
 13820  13821 -13822 -630 -13825 0

c  2+1 --> break 
c    (-b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧  p_630) -> break
c  in CNF:
c     b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 13820 -13821  13822 -630 1162 0


c  2-1 --> 1
c    (-b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧ -p_630) -> (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0)
c  in CNF:
c     b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_2
c     b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_1
c     b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨  b^{21, 31}_0
c  in DIMACS:
 13820 -13821  13822  630 -13823 0
 13820 -13821  13822  630 -13824 0
 13820 -13821  13822  630  13825 0

c  1-1 --> 0
c    (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0 ∧ -p_630) -> (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧ -b^{21, 31}_0)
c  in CNF:
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_2
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_1
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_0
c  in DIMACS:
 13820  13821 -13822  630 -13823 0
 13820  13821 -13822  630 -13824 0
 13820  13821 -13822  630 -13825 0

c  0-1 --> -1
c    (-b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧ -p_630) -> ( b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0)
c  in CNF:
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨  b^{21, 31}_2
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_1
c     b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨  b^{21, 31}_0
c  in DIMACS:
 13820  13821  13822  630  13823 0
 13820  13821  13822  630 -13824 0
 13820  13821  13822  630  13825 0

c  -1-1 --> -2
c    ( b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧  b^{21, 30}_0 ∧ -p_630) -> ( b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0)
c  in CNF:
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨  b^{21, 31}_2
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨  b^{21, 31}_1
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨  p_630 ∨ -b^{21, 31}_0
c  in DIMACS:
-13820  13821 -13822  630  13823 0
-13820  13821 -13822  630  13824 0
-13820  13821 -13822  630 -13825 0

c  -2-1 --> break 
c    ( b^{21, 30}_2 ∧  b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨  b^{21, 30}_0 ∨  p_630 ∨ break
c  in DIMACS:
-13820 -13821  13822  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 30}_2 ∧ -b^{21, 30}_1 ∧ -b^{21, 30}_0 ∧ true) 
c  in CNF:
c    -b^{21, 30}_2 ∨  b^{21, 30}_1 ∨  b^{21, 30}_0 ∨ false 
c  in DIMACS:
-13820  13821  13822  0

c  3 does not represent an automaton state.
c    -(-b^{21, 30}_2 ∧  b^{21, 30}_1 ∧  b^{21, 30}_0 ∧ true) 
c  in CNF:
c     b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ false 
c  in DIMACS:
 13820 -13821 -13822  0
c  -3 does not represent an automaton state.
c    -( b^{21, 30}_2 ∧  b^{21, 30}_1 ∧  b^{21, 30}_0 ∧ true) 
c  in CNF:
c    -b^{21, 30}_2 ∨ -b^{21, 30}_1 ∨ -b^{21, 30}_0 ∨ false 
c  in DIMACS:
-13820 -13821 -13822  0

c i = 31
c  -2+1 --> -1
c    ( b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧  p_651) -> ( b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0)
c  in CNF:
c    -b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨  b^{21, 32}_2
c    -b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_1
c    -b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨  b^{21, 32}_0
c  in DIMACS:
-13823 -13824  13825 -651  13826 0
-13823 -13824  13825 -651 -13827 0
-13823 -13824  13825 -651  13828 0

c  -1+1 --> 0
c    ( b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0 ∧  p_651) -> (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧ -b^{21, 32}_0)
c  in CNF:
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_2
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_1
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_0
c  in DIMACS:
-13823  13824 -13825 -651 -13826 0
-13823  13824 -13825 -651 -13827 0
-13823  13824 -13825 -651 -13828 0

c  0+1 --> 1
c    (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧  p_651) -> (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0)
c  in CNF:
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_2
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_1
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨  b^{21, 32}_0
c  in DIMACS:
 13823  13824  13825 -651 -13826 0
 13823  13824  13825 -651 -13827 0
 13823  13824  13825 -651  13828 0

c  1+1 --> 2
c    (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0 ∧  p_651) -> (-b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0)
c  in CNF:
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_2
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨  b^{21, 32}_1
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ -p_651 ∨ -b^{21, 32}_0
c  in DIMACS:
 13823  13824 -13825 -651 -13826 0
 13823  13824 -13825 -651  13827 0
 13823  13824 -13825 -651 -13828 0

c  2+1 --> break 
c    (-b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧  p_651) -> break
c  in CNF:
c     b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 13823 -13824  13825 -651 1162 0


c  2-1 --> 1
c    (-b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧ -p_651) -> (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0)
c  in CNF:
c     b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_2
c     b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_1
c     b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨  b^{21, 32}_0
c  in DIMACS:
 13823 -13824  13825  651 -13826 0
 13823 -13824  13825  651 -13827 0
 13823 -13824  13825  651  13828 0

c  1-1 --> 0
c    (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0 ∧ -p_651) -> (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧ -b^{21, 32}_0)
c  in CNF:
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_2
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_1
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_0
c  in DIMACS:
 13823  13824 -13825  651 -13826 0
 13823  13824 -13825  651 -13827 0
 13823  13824 -13825  651 -13828 0

c  0-1 --> -1
c    (-b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧ -p_651) -> ( b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0)
c  in CNF:
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨  b^{21, 32}_2
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_1
c     b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨  b^{21, 32}_0
c  in DIMACS:
 13823  13824  13825  651  13826 0
 13823  13824  13825  651 -13827 0
 13823  13824  13825  651  13828 0

c  -1-1 --> -2
c    ( b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧  b^{21, 31}_0 ∧ -p_651) -> ( b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0)
c  in CNF:
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨  b^{21, 32}_2
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨  b^{21, 32}_1
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨  p_651 ∨ -b^{21, 32}_0
c  in DIMACS:
-13823  13824 -13825  651  13826 0
-13823  13824 -13825  651  13827 0
-13823  13824 -13825  651 -13828 0

c  -2-1 --> break 
c    ( b^{21, 31}_2 ∧  b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨  b^{21, 31}_0 ∨  p_651 ∨ break
c  in DIMACS:
-13823 -13824  13825  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 31}_2 ∧ -b^{21, 31}_1 ∧ -b^{21, 31}_0 ∧ true) 
c  in CNF:
c    -b^{21, 31}_2 ∨  b^{21, 31}_1 ∨  b^{21, 31}_0 ∨ false 
c  in DIMACS:
-13823  13824  13825  0

c  3 does not represent an automaton state.
c    -(-b^{21, 31}_2 ∧  b^{21, 31}_1 ∧  b^{21, 31}_0 ∧ true) 
c  in CNF:
c     b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ false 
c  in DIMACS:
 13823 -13824 -13825  0
c  -3 does not represent an automaton state.
c    -( b^{21, 31}_2 ∧  b^{21, 31}_1 ∧  b^{21, 31}_0 ∧ true) 
c  in CNF:
c    -b^{21, 31}_2 ∨ -b^{21, 31}_1 ∨ -b^{21, 31}_0 ∨ false 
c  in DIMACS:
-13823 -13824 -13825  0

c i = 32
c  -2+1 --> -1
c    ( b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧  p_672) -> ( b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0)
c  in CNF:
c    -b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨  b^{21, 33}_2
c    -b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_1
c    -b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨  b^{21, 33}_0
c  in DIMACS:
-13826 -13827  13828 -672  13829 0
-13826 -13827  13828 -672 -13830 0
-13826 -13827  13828 -672  13831 0

c  -1+1 --> 0
c    ( b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0 ∧  p_672) -> (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧ -b^{21, 33}_0)
c  in CNF:
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_2
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_1
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_0
c  in DIMACS:
-13826  13827 -13828 -672 -13829 0
-13826  13827 -13828 -672 -13830 0
-13826  13827 -13828 -672 -13831 0

c  0+1 --> 1
c    (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧  p_672) -> (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0)
c  in CNF:
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_2
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_1
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨  b^{21, 33}_0
c  in DIMACS:
 13826  13827  13828 -672 -13829 0
 13826  13827  13828 -672 -13830 0
 13826  13827  13828 -672  13831 0

c  1+1 --> 2
c    (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0 ∧  p_672) -> (-b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0)
c  in CNF:
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_2
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨  b^{21, 33}_1
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ -p_672 ∨ -b^{21, 33}_0
c  in DIMACS:
 13826  13827 -13828 -672 -13829 0
 13826  13827 -13828 -672  13830 0
 13826  13827 -13828 -672 -13831 0

c  2+1 --> break 
c    (-b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧  p_672) -> break
c  in CNF:
c     b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 13826 -13827  13828 -672 1162 0


c  2-1 --> 1
c    (-b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧ -p_672) -> (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0)
c  in CNF:
c     b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_2
c     b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_1
c     b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨  b^{21, 33}_0
c  in DIMACS:
 13826 -13827  13828  672 -13829 0
 13826 -13827  13828  672 -13830 0
 13826 -13827  13828  672  13831 0

c  1-1 --> 0
c    (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0 ∧ -p_672) -> (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧ -b^{21, 33}_0)
c  in CNF:
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_2
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_1
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_0
c  in DIMACS:
 13826  13827 -13828  672 -13829 0
 13826  13827 -13828  672 -13830 0
 13826  13827 -13828  672 -13831 0

c  0-1 --> -1
c    (-b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧ -p_672) -> ( b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0)
c  in CNF:
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨  b^{21, 33}_2
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_1
c     b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨  b^{21, 33}_0
c  in DIMACS:
 13826  13827  13828  672  13829 0
 13826  13827  13828  672 -13830 0
 13826  13827  13828  672  13831 0

c  -1-1 --> -2
c    ( b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧  b^{21, 32}_0 ∧ -p_672) -> ( b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0)
c  in CNF:
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨  b^{21, 33}_2
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨  b^{21, 33}_1
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨  p_672 ∨ -b^{21, 33}_0
c  in DIMACS:
-13826  13827 -13828  672  13829 0
-13826  13827 -13828  672  13830 0
-13826  13827 -13828  672 -13831 0

c  -2-1 --> break 
c    ( b^{21, 32}_2 ∧  b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨  b^{21, 32}_0 ∨  p_672 ∨ break
c  in DIMACS:
-13826 -13827  13828  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 32}_2 ∧ -b^{21, 32}_1 ∧ -b^{21, 32}_0 ∧ true) 
c  in CNF:
c    -b^{21, 32}_2 ∨  b^{21, 32}_1 ∨  b^{21, 32}_0 ∨ false 
c  in DIMACS:
-13826  13827  13828  0

c  3 does not represent an automaton state.
c    -(-b^{21, 32}_2 ∧  b^{21, 32}_1 ∧  b^{21, 32}_0 ∧ true) 
c  in CNF:
c     b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ false 
c  in DIMACS:
 13826 -13827 -13828  0
c  -3 does not represent an automaton state.
c    -( b^{21, 32}_2 ∧  b^{21, 32}_1 ∧  b^{21, 32}_0 ∧ true) 
c  in CNF:
c    -b^{21, 32}_2 ∨ -b^{21, 32}_1 ∨ -b^{21, 32}_0 ∨ false 
c  in DIMACS:
-13826 -13827 -13828  0

c i = 33
c  -2+1 --> -1
c    ( b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧  p_693) -> ( b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0)
c  in CNF:
c    -b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨  b^{21, 34}_2
c    -b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_1
c    -b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨  b^{21, 34}_0
c  in DIMACS:
-13829 -13830  13831 -693  13832 0
-13829 -13830  13831 -693 -13833 0
-13829 -13830  13831 -693  13834 0

c  -1+1 --> 0
c    ( b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0 ∧  p_693) -> (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧ -b^{21, 34}_0)
c  in CNF:
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_2
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_1
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_0
c  in DIMACS:
-13829  13830 -13831 -693 -13832 0
-13829  13830 -13831 -693 -13833 0
-13829  13830 -13831 -693 -13834 0

c  0+1 --> 1
c    (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧  p_693) -> (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0)
c  in CNF:
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_2
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_1
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨  b^{21, 34}_0
c  in DIMACS:
 13829  13830  13831 -693 -13832 0
 13829  13830  13831 -693 -13833 0
 13829  13830  13831 -693  13834 0

c  1+1 --> 2
c    (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0 ∧  p_693) -> (-b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0)
c  in CNF:
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_2
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨  b^{21, 34}_1
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ -p_693 ∨ -b^{21, 34}_0
c  in DIMACS:
 13829  13830 -13831 -693 -13832 0
 13829  13830 -13831 -693  13833 0
 13829  13830 -13831 -693 -13834 0

c  2+1 --> break 
c    (-b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧  p_693) -> break
c  in CNF:
c     b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 13829 -13830  13831 -693 1162 0


c  2-1 --> 1
c    (-b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧ -p_693) -> (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0)
c  in CNF:
c     b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_2
c     b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_1
c     b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨  b^{21, 34}_0
c  in DIMACS:
 13829 -13830  13831  693 -13832 0
 13829 -13830  13831  693 -13833 0
 13829 -13830  13831  693  13834 0

c  1-1 --> 0
c    (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0 ∧ -p_693) -> (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧ -b^{21, 34}_0)
c  in CNF:
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_2
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_1
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_0
c  in DIMACS:
 13829  13830 -13831  693 -13832 0
 13829  13830 -13831  693 -13833 0
 13829  13830 -13831  693 -13834 0

c  0-1 --> -1
c    (-b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧ -p_693) -> ( b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0)
c  in CNF:
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨  b^{21, 34}_2
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_1
c     b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨  b^{21, 34}_0
c  in DIMACS:
 13829  13830  13831  693  13832 0
 13829  13830  13831  693 -13833 0
 13829  13830  13831  693  13834 0

c  -1-1 --> -2
c    ( b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧  b^{21, 33}_0 ∧ -p_693) -> ( b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0)
c  in CNF:
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨  b^{21, 34}_2
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨  b^{21, 34}_1
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨  p_693 ∨ -b^{21, 34}_0
c  in DIMACS:
-13829  13830 -13831  693  13832 0
-13829  13830 -13831  693  13833 0
-13829  13830 -13831  693 -13834 0

c  -2-1 --> break 
c    ( b^{21, 33}_2 ∧  b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨  b^{21, 33}_0 ∨  p_693 ∨ break
c  in DIMACS:
-13829 -13830  13831  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 33}_2 ∧ -b^{21, 33}_1 ∧ -b^{21, 33}_0 ∧ true) 
c  in CNF:
c    -b^{21, 33}_2 ∨  b^{21, 33}_1 ∨  b^{21, 33}_0 ∨ false 
c  in DIMACS:
-13829  13830  13831  0

c  3 does not represent an automaton state.
c    -(-b^{21, 33}_2 ∧  b^{21, 33}_1 ∧  b^{21, 33}_0 ∧ true) 
c  in CNF:
c     b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ false 
c  in DIMACS:
 13829 -13830 -13831  0
c  -3 does not represent an automaton state.
c    -( b^{21, 33}_2 ∧  b^{21, 33}_1 ∧  b^{21, 33}_0 ∧ true) 
c  in CNF:
c    -b^{21, 33}_2 ∨ -b^{21, 33}_1 ∨ -b^{21, 33}_0 ∨ false 
c  in DIMACS:
-13829 -13830 -13831  0

c i = 34
c  -2+1 --> -1
c    ( b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧  p_714) -> ( b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0)
c  in CNF:
c    -b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨  b^{21, 35}_2
c    -b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_1
c    -b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨  b^{21, 35}_0
c  in DIMACS:
-13832 -13833  13834 -714  13835 0
-13832 -13833  13834 -714 -13836 0
-13832 -13833  13834 -714  13837 0

c  -1+1 --> 0
c    ( b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0 ∧  p_714) -> (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧ -b^{21, 35}_0)
c  in CNF:
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_2
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_1
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_0
c  in DIMACS:
-13832  13833 -13834 -714 -13835 0
-13832  13833 -13834 -714 -13836 0
-13832  13833 -13834 -714 -13837 0

c  0+1 --> 1
c    (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧  p_714) -> (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0)
c  in CNF:
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_2
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_1
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨  b^{21, 35}_0
c  in DIMACS:
 13832  13833  13834 -714 -13835 0
 13832  13833  13834 -714 -13836 0
 13832  13833  13834 -714  13837 0

c  1+1 --> 2
c    (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0 ∧  p_714) -> (-b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0)
c  in CNF:
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_2
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨  b^{21, 35}_1
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ -p_714 ∨ -b^{21, 35}_0
c  in DIMACS:
 13832  13833 -13834 -714 -13835 0
 13832  13833 -13834 -714  13836 0
 13832  13833 -13834 -714 -13837 0

c  2+1 --> break 
c    (-b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧  p_714) -> break
c  in CNF:
c     b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 13832 -13833  13834 -714 1162 0


c  2-1 --> 1
c    (-b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧ -p_714) -> (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0)
c  in CNF:
c     b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_2
c     b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_1
c     b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨  b^{21, 35}_0
c  in DIMACS:
 13832 -13833  13834  714 -13835 0
 13832 -13833  13834  714 -13836 0
 13832 -13833  13834  714  13837 0

c  1-1 --> 0
c    (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0 ∧ -p_714) -> (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧ -b^{21, 35}_0)
c  in CNF:
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_2
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_1
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_0
c  in DIMACS:
 13832  13833 -13834  714 -13835 0
 13832  13833 -13834  714 -13836 0
 13832  13833 -13834  714 -13837 0

c  0-1 --> -1
c    (-b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧ -p_714) -> ( b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0)
c  in CNF:
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨  b^{21, 35}_2
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_1
c     b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨  b^{21, 35}_0
c  in DIMACS:
 13832  13833  13834  714  13835 0
 13832  13833  13834  714 -13836 0
 13832  13833  13834  714  13837 0

c  -1-1 --> -2
c    ( b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧  b^{21, 34}_0 ∧ -p_714) -> ( b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0)
c  in CNF:
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨  b^{21, 35}_2
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨  b^{21, 35}_1
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨  p_714 ∨ -b^{21, 35}_0
c  in DIMACS:
-13832  13833 -13834  714  13835 0
-13832  13833 -13834  714  13836 0
-13832  13833 -13834  714 -13837 0

c  -2-1 --> break 
c    ( b^{21, 34}_2 ∧  b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨  b^{21, 34}_0 ∨  p_714 ∨ break
c  in DIMACS:
-13832 -13833  13834  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 34}_2 ∧ -b^{21, 34}_1 ∧ -b^{21, 34}_0 ∧ true) 
c  in CNF:
c    -b^{21, 34}_2 ∨  b^{21, 34}_1 ∨  b^{21, 34}_0 ∨ false 
c  in DIMACS:
-13832  13833  13834  0

c  3 does not represent an automaton state.
c    -(-b^{21, 34}_2 ∧  b^{21, 34}_1 ∧  b^{21, 34}_0 ∧ true) 
c  in CNF:
c     b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ false 
c  in DIMACS:
 13832 -13833 -13834  0
c  -3 does not represent an automaton state.
c    -( b^{21, 34}_2 ∧  b^{21, 34}_1 ∧  b^{21, 34}_0 ∧ true) 
c  in CNF:
c    -b^{21, 34}_2 ∨ -b^{21, 34}_1 ∨ -b^{21, 34}_0 ∨ false 
c  in DIMACS:
-13832 -13833 -13834  0

c i = 35
c  -2+1 --> -1
c    ( b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧  p_735) -> ( b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0)
c  in CNF:
c    -b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨  b^{21, 36}_2
c    -b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_1
c    -b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨  b^{21, 36}_0
c  in DIMACS:
-13835 -13836  13837 -735  13838 0
-13835 -13836  13837 -735 -13839 0
-13835 -13836  13837 -735  13840 0

c  -1+1 --> 0
c    ( b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0 ∧  p_735) -> (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧ -b^{21, 36}_0)
c  in CNF:
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_2
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_1
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_0
c  in DIMACS:
-13835  13836 -13837 -735 -13838 0
-13835  13836 -13837 -735 -13839 0
-13835  13836 -13837 -735 -13840 0

c  0+1 --> 1
c    (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧  p_735) -> (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0)
c  in CNF:
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_2
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_1
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨  b^{21, 36}_0
c  in DIMACS:
 13835  13836  13837 -735 -13838 0
 13835  13836  13837 -735 -13839 0
 13835  13836  13837 -735  13840 0

c  1+1 --> 2
c    (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0 ∧  p_735) -> (-b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0)
c  in CNF:
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_2
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨  b^{21, 36}_1
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ -p_735 ∨ -b^{21, 36}_0
c  in DIMACS:
 13835  13836 -13837 -735 -13838 0
 13835  13836 -13837 -735  13839 0
 13835  13836 -13837 -735 -13840 0

c  2+1 --> break 
c    (-b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧  p_735) -> break
c  in CNF:
c     b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 13835 -13836  13837 -735 1162 0


c  2-1 --> 1
c    (-b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧ -p_735) -> (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0)
c  in CNF:
c     b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_2
c     b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_1
c     b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨  b^{21, 36}_0
c  in DIMACS:
 13835 -13836  13837  735 -13838 0
 13835 -13836  13837  735 -13839 0
 13835 -13836  13837  735  13840 0

c  1-1 --> 0
c    (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0 ∧ -p_735) -> (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧ -b^{21, 36}_0)
c  in CNF:
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_2
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_1
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_0
c  in DIMACS:
 13835  13836 -13837  735 -13838 0
 13835  13836 -13837  735 -13839 0
 13835  13836 -13837  735 -13840 0

c  0-1 --> -1
c    (-b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧ -p_735) -> ( b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0)
c  in CNF:
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨  b^{21, 36}_2
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_1
c     b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨  b^{21, 36}_0
c  in DIMACS:
 13835  13836  13837  735  13838 0
 13835  13836  13837  735 -13839 0
 13835  13836  13837  735  13840 0

c  -1-1 --> -2
c    ( b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧  b^{21, 35}_0 ∧ -p_735) -> ( b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0)
c  in CNF:
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨  b^{21, 36}_2
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨  b^{21, 36}_1
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨  p_735 ∨ -b^{21, 36}_0
c  in DIMACS:
-13835  13836 -13837  735  13838 0
-13835  13836 -13837  735  13839 0
-13835  13836 -13837  735 -13840 0

c  -2-1 --> break 
c    ( b^{21, 35}_2 ∧  b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨  b^{21, 35}_0 ∨  p_735 ∨ break
c  in DIMACS:
-13835 -13836  13837  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 35}_2 ∧ -b^{21, 35}_1 ∧ -b^{21, 35}_0 ∧ true) 
c  in CNF:
c    -b^{21, 35}_2 ∨  b^{21, 35}_1 ∨  b^{21, 35}_0 ∨ false 
c  in DIMACS:
-13835  13836  13837  0

c  3 does not represent an automaton state.
c    -(-b^{21, 35}_2 ∧  b^{21, 35}_1 ∧  b^{21, 35}_0 ∧ true) 
c  in CNF:
c     b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ false 
c  in DIMACS:
 13835 -13836 -13837  0
c  -3 does not represent an automaton state.
c    -( b^{21, 35}_2 ∧  b^{21, 35}_1 ∧  b^{21, 35}_0 ∧ true) 
c  in CNF:
c    -b^{21, 35}_2 ∨ -b^{21, 35}_1 ∨ -b^{21, 35}_0 ∨ false 
c  in DIMACS:
-13835 -13836 -13837  0

c i = 36
c  -2+1 --> -1
c    ( b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧  p_756) -> ( b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0)
c  in CNF:
c    -b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨  b^{21, 37}_2
c    -b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_1
c    -b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨  b^{21, 37}_0
c  in DIMACS:
-13838 -13839  13840 -756  13841 0
-13838 -13839  13840 -756 -13842 0
-13838 -13839  13840 -756  13843 0

c  -1+1 --> 0
c    ( b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0 ∧  p_756) -> (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧ -b^{21, 37}_0)
c  in CNF:
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_2
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_1
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_0
c  in DIMACS:
-13838  13839 -13840 -756 -13841 0
-13838  13839 -13840 -756 -13842 0
-13838  13839 -13840 -756 -13843 0

c  0+1 --> 1
c    (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧  p_756) -> (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0)
c  in CNF:
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_2
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_1
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨  b^{21, 37}_0
c  in DIMACS:
 13838  13839  13840 -756 -13841 0
 13838  13839  13840 -756 -13842 0
 13838  13839  13840 -756  13843 0

c  1+1 --> 2
c    (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0 ∧  p_756) -> (-b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0)
c  in CNF:
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_2
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨  b^{21, 37}_1
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ -p_756 ∨ -b^{21, 37}_0
c  in DIMACS:
 13838  13839 -13840 -756 -13841 0
 13838  13839 -13840 -756  13842 0
 13838  13839 -13840 -756 -13843 0

c  2+1 --> break 
c    (-b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧  p_756) -> break
c  in CNF:
c     b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 13838 -13839  13840 -756 1162 0


c  2-1 --> 1
c    (-b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧ -p_756) -> (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0)
c  in CNF:
c     b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_2
c     b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_1
c     b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨  b^{21, 37}_0
c  in DIMACS:
 13838 -13839  13840  756 -13841 0
 13838 -13839  13840  756 -13842 0
 13838 -13839  13840  756  13843 0

c  1-1 --> 0
c    (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0 ∧ -p_756) -> (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧ -b^{21, 37}_0)
c  in CNF:
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_2
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_1
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_0
c  in DIMACS:
 13838  13839 -13840  756 -13841 0
 13838  13839 -13840  756 -13842 0
 13838  13839 -13840  756 -13843 0

c  0-1 --> -1
c    (-b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧ -p_756) -> ( b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0)
c  in CNF:
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨  b^{21, 37}_2
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_1
c     b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨  b^{21, 37}_0
c  in DIMACS:
 13838  13839  13840  756  13841 0
 13838  13839  13840  756 -13842 0
 13838  13839  13840  756  13843 0

c  -1-1 --> -2
c    ( b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧  b^{21, 36}_0 ∧ -p_756) -> ( b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0)
c  in CNF:
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨  b^{21, 37}_2
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨  b^{21, 37}_1
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨  p_756 ∨ -b^{21, 37}_0
c  in DIMACS:
-13838  13839 -13840  756  13841 0
-13838  13839 -13840  756  13842 0
-13838  13839 -13840  756 -13843 0

c  -2-1 --> break 
c    ( b^{21, 36}_2 ∧  b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨  b^{21, 36}_0 ∨  p_756 ∨ break
c  in DIMACS:
-13838 -13839  13840  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 36}_2 ∧ -b^{21, 36}_1 ∧ -b^{21, 36}_0 ∧ true) 
c  in CNF:
c    -b^{21, 36}_2 ∨  b^{21, 36}_1 ∨  b^{21, 36}_0 ∨ false 
c  in DIMACS:
-13838  13839  13840  0

c  3 does not represent an automaton state.
c    -(-b^{21, 36}_2 ∧  b^{21, 36}_1 ∧  b^{21, 36}_0 ∧ true) 
c  in CNF:
c     b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ false 
c  in DIMACS:
 13838 -13839 -13840  0
c  -3 does not represent an automaton state.
c    -( b^{21, 36}_2 ∧  b^{21, 36}_1 ∧  b^{21, 36}_0 ∧ true) 
c  in CNF:
c    -b^{21, 36}_2 ∨ -b^{21, 36}_1 ∨ -b^{21, 36}_0 ∨ false 
c  in DIMACS:
-13838 -13839 -13840  0

c i = 37
c  -2+1 --> -1
c    ( b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧  p_777) -> ( b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0)
c  in CNF:
c    -b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨  b^{21, 38}_2
c    -b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_1
c    -b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨  b^{21, 38}_0
c  in DIMACS:
-13841 -13842  13843 -777  13844 0
-13841 -13842  13843 -777 -13845 0
-13841 -13842  13843 -777  13846 0

c  -1+1 --> 0
c    ( b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0 ∧  p_777) -> (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧ -b^{21, 38}_0)
c  in CNF:
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_2
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_1
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_0
c  in DIMACS:
-13841  13842 -13843 -777 -13844 0
-13841  13842 -13843 -777 -13845 0
-13841  13842 -13843 -777 -13846 0

c  0+1 --> 1
c    (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧  p_777) -> (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0)
c  in CNF:
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_2
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_1
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨  b^{21, 38}_0
c  in DIMACS:
 13841  13842  13843 -777 -13844 0
 13841  13842  13843 -777 -13845 0
 13841  13842  13843 -777  13846 0

c  1+1 --> 2
c    (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0 ∧  p_777) -> (-b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0)
c  in CNF:
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_2
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨  b^{21, 38}_1
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ -p_777 ∨ -b^{21, 38}_0
c  in DIMACS:
 13841  13842 -13843 -777 -13844 0
 13841  13842 -13843 -777  13845 0
 13841  13842 -13843 -777 -13846 0

c  2+1 --> break 
c    (-b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧  p_777) -> break
c  in CNF:
c     b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 13841 -13842  13843 -777 1162 0


c  2-1 --> 1
c    (-b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧ -p_777) -> (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0)
c  in CNF:
c     b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_2
c     b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_1
c     b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨  b^{21, 38}_0
c  in DIMACS:
 13841 -13842  13843  777 -13844 0
 13841 -13842  13843  777 -13845 0
 13841 -13842  13843  777  13846 0

c  1-1 --> 0
c    (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0 ∧ -p_777) -> (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧ -b^{21, 38}_0)
c  in CNF:
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_2
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_1
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_0
c  in DIMACS:
 13841  13842 -13843  777 -13844 0
 13841  13842 -13843  777 -13845 0
 13841  13842 -13843  777 -13846 0

c  0-1 --> -1
c    (-b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧ -p_777) -> ( b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0)
c  in CNF:
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨  b^{21, 38}_2
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_1
c     b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨  b^{21, 38}_0
c  in DIMACS:
 13841  13842  13843  777  13844 0
 13841  13842  13843  777 -13845 0
 13841  13842  13843  777  13846 0

c  -1-1 --> -2
c    ( b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧  b^{21, 37}_0 ∧ -p_777) -> ( b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0)
c  in CNF:
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨  b^{21, 38}_2
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨  b^{21, 38}_1
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨  p_777 ∨ -b^{21, 38}_0
c  in DIMACS:
-13841  13842 -13843  777  13844 0
-13841  13842 -13843  777  13845 0
-13841  13842 -13843  777 -13846 0

c  -2-1 --> break 
c    ( b^{21, 37}_2 ∧  b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨  b^{21, 37}_0 ∨  p_777 ∨ break
c  in DIMACS:
-13841 -13842  13843  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 37}_2 ∧ -b^{21, 37}_1 ∧ -b^{21, 37}_0 ∧ true) 
c  in CNF:
c    -b^{21, 37}_2 ∨  b^{21, 37}_1 ∨  b^{21, 37}_0 ∨ false 
c  in DIMACS:
-13841  13842  13843  0

c  3 does not represent an automaton state.
c    -(-b^{21, 37}_2 ∧  b^{21, 37}_1 ∧  b^{21, 37}_0 ∧ true) 
c  in CNF:
c     b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ false 
c  in DIMACS:
 13841 -13842 -13843  0
c  -3 does not represent an automaton state.
c    -( b^{21, 37}_2 ∧  b^{21, 37}_1 ∧  b^{21, 37}_0 ∧ true) 
c  in CNF:
c    -b^{21, 37}_2 ∨ -b^{21, 37}_1 ∨ -b^{21, 37}_0 ∨ false 
c  in DIMACS:
-13841 -13842 -13843  0

c i = 38
c  -2+1 --> -1
c    ( b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧  p_798) -> ( b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0)
c  in CNF:
c    -b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨  b^{21, 39}_2
c    -b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_1
c    -b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨  b^{21, 39}_0
c  in DIMACS:
-13844 -13845  13846 -798  13847 0
-13844 -13845  13846 -798 -13848 0
-13844 -13845  13846 -798  13849 0

c  -1+1 --> 0
c    ( b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0 ∧  p_798) -> (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧ -b^{21, 39}_0)
c  in CNF:
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_2
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_1
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_0
c  in DIMACS:
-13844  13845 -13846 -798 -13847 0
-13844  13845 -13846 -798 -13848 0
-13844  13845 -13846 -798 -13849 0

c  0+1 --> 1
c    (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧  p_798) -> (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0)
c  in CNF:
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_2
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_1
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨  b^{21, 39}_0
c  in DIMACS:
 13844  13845  13846 -798 -13847 0
 13844  13845  13846 -798 -13848 0
 13844  13845  13846 -798  13849 0

c  1+1 --> 2
c    (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0 ∧  p_798) -> (-b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0)
c  in CNF:
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_2
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨  b^{21, 39}_1
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ -p_798 ∨ -b^{21, 39}_0
c  in DIMACS:
 13844  13845 -13846 -798 -13847 0
 13844  13845 -13846 -798  13848 0
 13844  13845 -13846 -798 -13849 0

c  2+1 --> break 
c    (-b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧  p_798) -> break
c  in CNF:
c     b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 13844 -13845  13846 -798 1162 0


c  2-1 --> 1
c    (-b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧ -p_798) -> (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0)
c  in CNF:
c     b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_2
c     b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_1
c     b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨  b^{21, 39}_0
c  in DIMACS:
 13844 -13845  13846  798 -13847 0
 13844 -13845  13846  798 -13848 0
 13844 -13845  13846  798  13849 0

c  1-1 --> 0
c    (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0 ∧ -p_798) -> (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧ -b^{21, 39}_0)
c  in CNF:
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_2
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_1
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_0
c  in DIMACS:
 13844  13845 -13846  798 -13847 0
 13844  13845 -13846  798 -13848 0
 13844  13845 -13846  798 -13849 0

c  0-1 --> -1
c    (-b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧ -p_798) -> ( b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0)
c  in CNF:
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨  b^{21, 39}_2
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_1
c     b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨  b^{21, 39}_0
c  in DIMACS:
 13844  13845  13846  798  13847 0
 13844  13845  13846  798 -13848 0
 13844  13845  13846  798  13849 0

c  -1-1 --> -2
c    ( b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧  b^{21, 38}_0 ∧ -p_798) -> ( b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0)
c  in CNF:
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨  b^{21, 39}_2
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨  b^{21, 39}_1
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨  p_798 ∨ -b^{21, 39}_0
c  in DIMACS:
-13844  13845 -13846  798  13847 0
-13844  13845 -13846  798  13848 0
-13844  13845 -13846  798 -13849 0

c  -2-1 --> break 
c    ( b^{21, 38}_2 ∧  b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨  b^{21, 38}_0 ∨  p_798 ∨ break
c  in DIMACS:
-13844 -13845  13846  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 38}_2 ∧ -b^{21, 38}_1 ∧ -b^{21, 38}_0 ∧ true) 
c  in CNF:
c    -b^{21, 38}_2 ∨  b^{21, 38}_1 ∨  b^{21, 38}_0 ∨ false 
c  in DIMACS:
-13844  13845  13846  0

c  3 does not represent an automaton state.
c    -(-b^{21, 38}_2 ∧  b^{21, 38}_1 ∧  b^{21, 38}_0 ∧ true) 
c  in CNF:
c     b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ false 
c  in DIMACS:
 13844 -13845 -13846  0
c  -3 does not represent an automaton state.
c    -( b^{21, 38}_2 ∧  b^{21, 38}_1 ∧  b^{21, 38}_0 ∧ true) 
c  in CNF:
c    -b^{21, 38}_2 ∨ -b^{21, 38}_1 ∨ -b^{21, 38}_0 ∨ false 
c  in DIMACS:
-13844 -13845 -13846  0

c i = 39
c  -2+1 --> -1
c    ( b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧  p_819) -> ( b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0)
c  in CNF:
c    -b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨  b^{21, 40}_2
c    -b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_1
c    -b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨  b^{21, 40}_0
c  in DIMACS:
-13847 -13848  13849 -819  13850 0
-13847 -13848  13849 -819 -13851 0
-13847 -13848  13849 -819  13852 0

c  -1+1 --> 0
c    ( b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0 ∧  p_819) -> (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧ -b^{21, 40}_0)
c  in CNF:
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_2
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_1
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_0
c  in DIMACS:
-13847  13848 -13849 -819 -13850 0
-13847  13848 -13849 -819 -13851 0
-13847  13848 -13849 -819 -13852 0

c  0+1 --> 1
c    (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧  p_819) -> (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0)
c  in CNF:
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_2
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_1
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨  b^{21, 40}_0
c  in DIMACS:
 13847  13848  13849 -819 -13850 0
 13847  13848  13849 -819 -13851 0
 13847  13848  13849 -819  13852 0

c  1+1 --> 2
c    (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0 ∧  p_819) -> (-b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0)
c  in CNF:
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_2
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨  b^{21, 40}_1
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ -p_819 ∨ -b^{21, 40}_0
c  in DIMACS:
 13847  13848 -13849 -819 -13850 0
 13847  13848 -13849 -819  13851 0
 13847  13848 -13849 -819 -13852 0

c  2+1 --> break 
c    (-b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧  p_819) -> break
c  in CNF:
c     b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 13847 -13848  13849 -819 1162 0


c  2-1 --> 1
c    (-b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧ -p_819) -> (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0)
c  in CNF:
c     b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_2
c     b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_1
c     b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨  b^{21, 40}_0
c  in DIMACS:
 13847 -13848  13849  819 -13850 0
 13847 -13848  13849  819 -13851 0
 13847 -13848  13849  819  13852 0

c  1-1 --> 0
c    (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0 ∧ -p_819) -> (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧ -b^{21, 40}_0)
c  in CNF:
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_2
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_1
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_0
c  in DIMACS:
 13847  13848 -13849  819 -13850 0
 13847  13848 -13849  819 -13851 0
 13847  13848 -13849  819 -13852 0

c  0-1 --> -1
c    (-b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧ -p_819) -> ( b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0)
c  in CNF:
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨  b^{21, 40}_2
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_1
c     b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨  b^{21, 40}_0
c  in DIMACS:
 13847  13848  13849  819  13850 0
 13847  13848  13849  819 -13851 0
 13847  13848  13849  819  13852 0

c  -1-1 --> -2
c    ( b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧  b^{21, 39}_0 ∧ -p_819) -> ( b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0)
c  in CNF:
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨  b^{21, 40}_2
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨  b^{21, 40}_1
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨  p_819 ∨ -b^{21, 40}_0
c  in DIMACS:
-13847  13848 -13849  819  13850 0
-13847  13848 -13849  819  13851 0
-13847  13848 -13849  819 -13852 0

c  -2-1 --> break 
c    ( b^{21, 39}_2 ∧  b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨  b^{21, 39}_0 ∨  p_819 ∨ break
c  in DIMACS:
-13847 -13848  13849  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 39}_2 ∧ -b^{21, 39}_1 ∧ -b^{21, 39}_0 ∧ true) 
c  in CNF:
c    -b^{21, 39}_2 ∨  b^{21, 39}_1 ∨  b^{21, 39}_0 ∨ false 
c  in DIMACS:
-13847  13848  13849  0

c  3 does not represent an automaton state.
c    -(-b^{21, 39}_2 ∧  b^{21, 39}_1 ∧  b^{21, 39}_0 ∧ true) 
c  in CNF:
c     b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ false 
c  in DIMACS:
 13847 -13848 -13849  0
c  -3 does not represent an automaton state.
c    -( b^{21, 39}_2 ∧  b^{21, 39}_1 ∧  b^{21, 39}_0 ∧ true) 
c  in CNF:
c    -b^{21, 39}_2 ∨ -b^{21, 39}_1 ∨ -b^{21, 39}_0 ∨ false 
c  in DIMACS:
-13847 -13848 -13849  0

c i = 40
c  -2+1 --> -1
c    ( b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧  p_840) -> ( b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0)
c  in CNF:
c    -b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨  b^{21, 41}_2
c    -b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_1
c    -b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨  b^{21, 41}_0
c  in DIMACS:
-13850 -13851  13852 -840  13853 0
-13850 -13851  13852 -840 -13854 0
-13850 -13851  13852 -840  13855 0

c  -1+1 --> 0
c    ( b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0 ∧  p_840) -> (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧ -b^{21, 41}_0)
c  in CNF:
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_2
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_1
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_0
c  in DIMACS:
-13850  13851 -13852 -840 -13853 0
-13850  13851 -13852 -840 -13854 0
-13850  13851 -13852 -840 -13855 0

c  0+1 --> 1
c    (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧  p_840) -> (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0)
c  in CNF:
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_2
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_1
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨  b^{21, 41}_0
c  in DIMACS:
 13850  13851  13852 -840 -13853 0
 13850  13851  13852 -840 -13854 0
 13850  13851  13852 -840  13855 0

c  1+1 --> 2
c    (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0 ∧  p_840) -> (-b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0)
c  in CNF:
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_2
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨  b^{21, 41}_1
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ -p_840 ∨ -b^{21, 41}_0
c  in DIMACS:
 13850  13851 -13852 -840 -13853 0
 13850  13851 -13852 -840  13854 0
 13850  13851 -13852 -840 -13855 0

c  2+1 --> break 
c    (-b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧  p_840) -> break
c  in CNF:
c     b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 13850 -13851  13852 -840 1162 0


c  2-1 --> 1
c    (-b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧ -p_840) -> (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0)
c  in CNF:
c     b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_2
c     b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_1
c     b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨  b^{21, 41}_0
c  in DIMACS:
 13850 -13851  13852  840 -13853 0
 13850 -13851  13852  840 -13854 0
 13850 -13851  13852  840  13855 0

c  1-1 --> 0
c    (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0 ∧ -p_840) -> (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧ -b^{21, 41}_0)
c  in CNF:
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_2
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_1
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_0
c  in DIMACS:
 13850  13851 -13852  840 -13853 0
 13850  13851 -13852  840 -13854 0
 13850  13851 -13852  840 -13855 0

c  0-1 --> -1
c    (-b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧ -p_840) -> ( b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0)
c  in CNF:
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨  b^{21, 41}_2
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_1
c     b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨  b^{21, 41}_0
c  in DIMACS:
 13850  13851  13852  840  13853 0
 13850  13851  13852  840 -13854 0
 13850  13851  13852  840  13855 0

c  -1-1 --> -2
c    ( b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧  b^{21, 40}_0 ∧ -p_840) -> ( b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0)
c  in CNF:
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨  b^{21, 41}_2
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨  b^{21, 41}_1
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨  p_840 ∨ -b^{21, 41}_0
c  in DIMACS:
-13850  13851 -13852  840  13853 0
-13850  13851 -13852  840  13854 0
-13850  13851 -13852  840 -13855 0

c  -2-1 --> break 
c    ( b^{21, 40}_2 ∧  b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨  b^{21, 40}_0 ∨  p_840 ∨ break
c  in DIMACS:
-13850 -13851  13852  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 40}_2 ∧ -b^{21, 40}_1 ∧ -b^{21, 40}_0 ∧ true) 
c  in CNF:
c    -b^{21, 40}_2 ∨  b^{21, 40}_1 ∨  b^{21, 40}_0 ∨ false 
c  in DIMACS:
-13850  13851  13852  0

c  3 does not represent an automaton state.
c    -(-b^{21, 40}_2 ∧  b^{21, 40}_1 ∧  b^{21, 40}_0 ∧ true) 
c  in CNF:
c     b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ false 
c  in DIMACS:
 13850 -13851 -13852  0
c  -3 does not represent an automaton state.
c    -( b^{21, 40}_2 ∧  b^{21, 40}_1 ∧  b^{21, 40}_0 ∧ true) 
c  in CNF:
c    -b^{21, 40}_2 ∨ -b^{21, 40}_1 ∨ -b^{21, 40}_0 ∨ false 
c  in DIMACS:
-13850 -13851 -13852  0

c i = 41
c  -2+1 --> -1
c    ( b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧  p_861) -> ( b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0)
c  in CNF:
c    -b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨  b^{21, 42}_2
c    -b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_1
c    -b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨  b^{21, 42}_0
c  in DIMACS:
-13853 -13854  13855 -861  13856 0
-13853 -13854  13855 -861 -13857 0
-13853 -13854  13855 -861  13858 0

c  -1+1 --> 0
c    ( b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0 ∧  p_861) -> (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧ -b^{21, 42}_0)
c  in CNF:
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_2
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_1
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_0
c  in DIMACS:
-13853  13854 -13855 -861 -13856 0
-13853  13854 -13855 -861 -13857 0
-13853  13854 -13855 -861 -13858 0

c  0+1 --> 1
c    (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧  p_861) -> (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0)
c  in CNF:
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_2
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_1
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨  b^{21, 42}_0
c  in DIMACS:
 13853  13854  13855 -861 -13856 0
 13853  13854  13855 -861 -13857 0
 13853  13854  13855 -861  13858 0

c  1+1 --> 2
c    (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0 ∧  p_861) -> (-b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0)
c  in CNF:
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_2
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨  b^{21, 42}_1
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ -p_861 ∨ -b^{21, 42}_0
c  in DIMACS:
 13853  13854 -13855 -861 -13856 0
 13853  13854 -13855 -861  13857 0
 13853  13854 -13855 -861 -13858 0

c  2+1 --> break 
c    (-b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧  p_861) -> break
c  in CNF:
c     b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 13853 -13854  13855 -861 1162 0


c  2-1 --> 1
c    (-b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧ -p_861) -> (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0)
c  in CNF:
c     b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_2
c     b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_1
c     b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨  b^{21, 42}_0
c  in DIMACS:
 13853 -13854  13855  861 -13856 0
 13853 -13854  13855  861 -13857 0
 13853 -13854  13855  861  13858 0

c  1-1 --> 0
c    (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0 ∧ -p_861) -> (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧ -b^{21, 42}_0)
c  in CNF:
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_2
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_1
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_0
c  in DIMACS:
 13853  13854 -13855  861 -13856 0
 13853  13854 -13855  861 -13857 0
 13853  13854 -13855  861 -13858 0

c  0-1 --> -1
c    (-b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧ -p_861) -> ( b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0)
c  in CNF:
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨  b^{21, 42}_2
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_1
c     b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨  b^{21, 42}_0
c  in DIMACS:
 13853  13854  13855  861  13856 0
 13853  13854  13855  861 -13857 0
 13853  13854  13855  861  13858 0

c  -1-1 --> -2
c    ( b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧  b^{21, 41}_0 ∧ -p_861) -> ( b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0)
c  in CNF:
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨  b^{21, 42}_2
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨  b^{21, 42}_1
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨  p_861 ∨ -b^{21, 42}_0
c  in DIMACS:
-13853  13854 -13855  861  13856 0
-13853  13854 -13855  861  13857 0
-13853  13854 -13855  861 -13858 0

c  -2-1 --> break 
c    ( b^{21, 41}_2 ∧  b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨  b^{21, 41}_0 ∨  p_861 ∨ break
c  in DIMACS:
-13853 -13854  13855  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 41}_2 ∧ -b^{21, 41}_1 ∧ -b^{21, 41}_0 ∧ true) 
c  in CNF:
c    -b^{21, 41}_2 ∨  b^{21, 41}_1 ∨  b^{21, 41}_0 ∨ false 
c  in DIMACS:
-13853  13854  13855  0

c  3 does not represent an automaton state.
c    -(-b^{21, 41}_2 ∧  b^{21, 41}_1 ∧  b^{21, 41}_0 ∧ true) 
c  in CNF:
c     b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ false 
c  in DIMACS:
 13853 -13854 -13855  0
c  -3 does not represent an automaton state.
c    -( b^{21, 41}_2 ∧  b^{21, 41}_1 ∧  b^{21, 41}_0 ∧ true) 
c  in CNF:
c    -b^{21, 41}_2 ∨ -b^{21, 41}_1 ∨ -b^{21, 41}_0 ∨ false 
c  in DIMACS:
-13853 -13854 -13855  0

c i = 42
c  -2+1 --> -1
c    ( b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧  p_882) -> ( b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0)
c  in CNF:
c    -b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨  b^{21, 43}_2
c    -b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_1
c    -b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨  b^{21, 43}_0
c  in DIMACS:
-13856 -13857  13858 -882  13859 0
-13856 -13857  13858 -882 -13860 0
-13856 -13857  13858 -882  13861 0

c  -1+1 --> 0
c    ( b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0 ∧  p_882) -> (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧ -b^{21, 43}_0)
c  in CNF:
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_2
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_1
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_0
c  in DIMACS:
-13856  13857 -13858 -882 -13859 0
-13856  13857 -13858 -882 -13860 0
-13856  13857 -13858 -882 -13861 0

c  0+1 --> 1
c    (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧  p_882) -> (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0)
c  in CNF:
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_2
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_1
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨  b^{21, 43}_0
c  in DIMACS:
 13856  13857  13858 -882 -13859 0
 13856  13857  13858 -882 -13860 0
 13856  13857  13858 -882  13861 0

c  1+1 --> 2
c    (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0 ∧  p_882) -> (-b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0)
c  in CNF:
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_2
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨  b^{21, 43}_1
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ -p_882 ∨ -b^{21, 43}_0
c  in DIMACS:
 13856  13857 -13858 -882 -13859 0
 13856  13857 -13858 -882  13860 0
 13856  13857 -13858 -882 -13861 0

c  2+1 --> break 
c    (-b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧  p_882) -> break
c  in CNF:
c     b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 13856 -13857  13858 -882 1162 0


c  2-1 --> 1
c    (-b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧ -p_882) -> (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0)
c  in CNF:
c     b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_2
c     b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_1
c     b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨  b^{21, 43}_0
c  in DIMACS:
 13856 -13857  13858  882 -13859 0
 13856 -13857  13858  882 -13860 0
 13856 -13857  13858  882  13861 0

c  1-1 --> 0
c    (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0 ∧ -p_882) -> (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧ -b^{21, 43}_0)
c  in CNF:
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_2
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_1
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_0
c  in DIMACS:
 13856  13857 -13858  882 -13859 0
 13856  13857 -13858  882 -13860 0
 13856  13857 -13858  882 -13861 0

c  0-1 --> -1
c    (-b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧ -p_882) -> ( b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0)
c  in CNF:
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨  b^{21, 43}_2
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_1
c     b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨  b^{21, 43}_0
c  in DIMACS:
 13856  13857  13858  882  13859 0
 13856  13857  13858  882 -13860 0
 13856  13857  13858  882  13861 0

c  -1-1 --> -2
c    ( b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧  b^{21, 42}_0 ∧ -p_882) -> ( b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0)
c  in CNF:
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨  b^{21, 43}_2
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨  b^{21, 43}_1
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨  p_882 ∨ -b^{21, 43}_0
c  in DIMACS:
-13856  13857 -13858  882  13859 0
-13856  13857 -13858  882  13860 0
-13856  13857 -13858  882 -13861 0

c  -2-1 --> break 
c    ( b^{21, 42}_2 ∧  b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨  b^{21, 42}_0 ∨  p_882 ∨ break
c  in DIMACS:
-13856 -13857  13858  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 42}_2 ∧ -b^{21, 42}_1 ∧ -b^{21, 42}_0 ∧ true) 
c  in CNF:
c    -b^{21, 42}_2 ∨  b^{21, 42}_1 ∨  b^{21, 42}_0 ∨ false 
c  in DIMACS:
-13856  13857  13858  0

c  3 does not represent an automaton state.
c    -(-b^{21, 42}_2 ∧  b^{21, 42}_1 ∧  b^{21, 42}_0 ∧ true) 
c  in CNF:
c     b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ false 
c  in DIMACS:
 13856 -13857 -13858  0
c  -3 does not represent an automaton state.
c    -( b^{21, 42}_2 ∧  b^{21, 42}_1 ∧  b^{21, 42}_0 ∧ true) 
c  in CNF:
c    -b^{21, 42}_2 ∨ -b^{21, 42}_1 ∨ -b^{21, 42}_0 ∨ false 
c  in DIMACS:
-13856 -13857 -13858  0

c i = 43
c  -2+1 --> -1
c    ( b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧  p_903) -> ( b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0)
c  in CNF:
c    -b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨  b^{21, 44}_2
c    -b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_1
c    -b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨  b^{21, 44}_0
c  in DIMACS:
-13859 -13860  13861 -903  13862 0
-13859 -13860  13861 -903 -13863 0
-13859 -13860  13861 -903  13864 0

c  -1+1 --> 0
c    ( b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0 ∧  p_903) -> (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧ -b^{21, 44}_0)
c  in CNF:
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_2
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_1
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_0
c  in DIMACS:
-13859  13860 -13861 -903 -13862 0
-13859  13860 -13861 -903 -13863 0
-13859  13860 -13861 -903 -13864 0

c  0+1 --> 1
c    (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧  p_903) -> (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0)
c  in CNF:
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_2
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_1
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨  b^{21, 44}_0
c  in DIMACS:
 13859  13860  13861 -903 -13862 0
 13859  13860  13861 -903 -13863 0
 13859  13860  13861 -903  13864 0

c  1+1 --> 2
c    (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0 ∧  p_903) -> (-b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0)
c  in CNF:
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_2
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨  b^{21, 44}_1
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ -p_903 ∨ -b^{21, 44}_0
c  in DIMACS:
 13859  13860 -13861 -903 -13862 0
 13859  13860 -13861 -903  13863 0
 13859  13860 -13861 -903 -13864 0

c  2+1 --> break 
c    (-b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧  p_903) -> break
c  in CNF:
c     b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 13859 -13860  13861 -903 1162 0


c  2-1 --> 1
c    (-b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧ -p_903) -> (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0)
c  in CNF:
c     b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_2
c     b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_1
c     b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨  b^{21, 44}_0
c  in DIMACS:
 13859 -13860  13861  903 -13862 0
 13859 -13860  13861  903 -13863 0
 13859 -13860  13861  903  13864 0

c  1-1 --> 0
c    (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0 ∧ -p_903) -> (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧ -b^{21, 44}_0)
c  in CNF:
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_2
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_1
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_0
c  in DIMACS:
 13859  13860 -13861  903 -13862 0
 13859  13860 -13861  903 -13863 0
 13859  13860 -13861  903 -13864 0

c  0-1 --> -1
c    (-b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧ -p_903) -> ( b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0)
c  in CNF:
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨  b^{21, 44}_2
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_1
c     b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨  b^{21, 44}_0
c  in DIMACS:
 13859  13860  13861  903  13862 0
 13859  13860  13861  903 -13863 0
 13859  13860  13861  903  13864 0

c  -1-1 --> -2
c    ( b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧  b^{21, 43}_0 ∧ -p_903) -> ( b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0)
c  in CNF:
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨  b^{21, 44}_2
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨  b^{21, 44}_1
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨  p_903 ∨ -b^{21, 44}_0
c  in DIMACS:
-13859  13860 -13861  903  13862 0
-13859  13860 -13861  903  13863 0
-13859  13860 -13861  903 -13864 0

c  -2-1 --> break 
c    ( b^{21, 43}_2 ∧  b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨  b^{21, 43}_0 ∨  p_903 ∨ break
c  in DIMACS:
-13859 -13860  13861  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 43}_2 ∧ -b^{21, 43}_1 ∧ -b^{21, 43}_0 ∧ true) 
c  in CNF:
c    -b^{21, 43}_2 ∨  b^{21, 43}_1 ∨  b^{21, 43}_0 ∨ false 
c  in DIMACS:
-13859  13860  13861  0

c  3 does not represent an automaton state.
c    -(-b^{21, 43}_2 ∧  b^{21, 43}_1 ∧  b^{21, 43}_0 ∧ true) 
c  in CNF:
c     b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ false 
c  in DIMACS:
 13859 -13860 -13861  0
c  -3 does not represent an automaton state.
c    -( b^{21, 43}_2 ∧  b^{21, 43}_1 ∧  b^{21, 43}_0 ∧ true) 
c  in CNF:
c    -b^{21, 43}_2 ∨ -b^{21, 43}_1 ∨ -b^{21, 43}_0 ∨ false 
c  in DIMACS:
-13859 -13860 -13861  0

c i = 44
c  -2+1 --> -1
c    ( b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧  p_924) -> ( b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0)
c  in CNF:
c    -b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨  b^{21, 45}_2
c    -b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_1
c    -b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨  b^{21, 45}_0
c  in DIMACS:
-13862 -13863  13864 -924  13865 0
-13862 -13863  13864 -924 -13866 0
-13862 -13863  13864 -924  13867 0

c  -1+1 --> 0
c    ( b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0 ∧  p_924) -> (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧ -b^{21, 45}_0)
c  in CNF:
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_2
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_1
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_0
c  in DIMACS:
-13862  13863 -13864 -924 -13865 0
-13862  13863 -13864 -924 -13866 0
-13862  13863 -13864 -924 -13867 0

c  0+1 --> 1
c    (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧  p_924) -> (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0)
c  in CNF:
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_2
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_1
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨  b^{21, 45}_0
c  in DIMACS:
 13862  13863  13864 -924 -13865 0
 13862  13863  13864 -924 -13866 0
 13862  13863  13864 -924  13867 0

c  1+1 --> 2
c    (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0 ∧  p_924) -> (-b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0)
c  in CNF:
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_2
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨  b^{21, 45}_1
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ -p_924 ∨ -b^{21, 45}_0
c  in DIMACS:
 13862  13863 -13864 -924 -13865 0
 13862  13863 -13864 -924  13866 0
 13862  13863 -13864 -924 -13867 0

c  2+1 --> break 
c    (-b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧  p_924) -> break
c  in CNF:
c     b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 13862 -13863  13864 -924 1162 0


c  2-1 --> 1
c    (-b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧ -p_924) -> (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0)
c  in CNF:
c     b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_2
c     b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_1
c     b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨  b^{21, 45}_0
c  in DIMACS:
 13862 -13863  13864  924 -13865 0
 13862 -13863  13864  924 -13866 0
 13862 -13863  13864  924  13867 0

c  1-1 --> 0
c    (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0 ∧ -p_924) -> (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧ -b^{21, 45}_0)
c  in CNF:
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_2
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_1
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_0
c  in DIMACS:
 13862  13863 -13864  924 -13865 0
 13862  13863 -13864  924 -13866 0
 13862  13863 -13864  924 -13867 0

c  0-1 --> -1
c    (-b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧ -p_924) -> ( b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0)
c  in CNF:
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨  b^{21, 45}_2
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_1
c     b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨  b^{21, 45}_0
c  in DIMACS:
 13862  13863  13864  924  13865 0
 13862  13863  13864  924 -13866 0
 13862  13863  13864  924  13867 0

c  -1-1 --> -2
c    ( b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧  b^{21, 44}_0 ∧ -p_924) -> ( b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0)
c  in CNF:
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨  b^{21, 45}_2
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨  b^{21, 45}_1
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨  p_924 ∨ -b^{21, 45}_0
c  in DIMACS:
-13862  13863 -13864  924  13865 0
-13862  13863 -13864  924  13866 0
-13862  13863 -13864  924 -13867 0

c  -2-1 --> break 
c    ( b^{21, 44}_2 ∧  b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨  b^{21, 44}_0 ∨  p_924 ∨ break
c  in DIMACS:
-13862 -13863  13864  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 44}_2 ∧ -b^{21, 44}_1 ∧ -b^{21, 44}_0 ∧ true) 
c  in CNF:
c    -b^{21, 44}_2 ∨  b^{21, 44}_1 ∨  b^{21, 44}_0 ∨ false 
c  in DIMACS:
-13862  13863  13864  0

c  3 does not represent an automaton state.
c    -(-b^{21, 44}_2 ∧  b^{21, 44}_1 ∧  b^{21, 44}_0 ∧ true) 
c  in CNF:
c     b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ false 
c  in DIMACS:
 13862 -13863 -13864  0
c  -3 does not represent an automaton state.
c    -( b^{21, 44}_2 ∧  b^{21, 44}_1 ∧  b^{21, 44}_0 ∧ true) 
c  in CNF:
c    -b^{21, 44}_2 ∨ -b^{21, 44}_1 ∨ -b^{21, 44}_0 ∨ false 
c  in DIMACS:
-13862 -13863 -13864  0

c i = 45
c  -2+1 --> -1
c    ( b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧  p_945) -> ( b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0)
c  in CNF:
c    -b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨  b^{21, 46}_2
c    -b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_1
c    -b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨  b^{21, 46}_0
c  in DIMACS:
-13865 -13866  13867 -945  13868 0
-13865 -13866  13867 -945 -13869 0
-13865 -13866  13867 -945  13870 0

c  -1+1 --> 0
c    ( b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0 ∧  p_945) -> (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧ -b^{21, 46}_0)
c  in CNF:
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_2
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_1
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_0
c  in DIMACS:
-13865  13866 -13867 -945 -13868 0
-13865  13866 -13867 -945 -13869 0
-13865  13866 -13867 -945 -13870 0

c  0+1 --> 1
c    (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧  p_945) -> (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0)
c  in CNF:
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_2
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_1
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨  b^{21, 46}_0
c  in DIMACS:
 13865  13866  13867 -945 -13868 0
 13865  13866  13867 -945 -13869 0
 13865  13866  13867 -945  13870 0

c  1+1 --> 2
c    (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0 ∧  p_945) -> (-b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0)
c  in CNF:
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_2
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨  b^{21, 46}_1
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ -p_945 ∨ -b^{21, 46}_0
c  in DIMACS:
 13865  13866 -13867 -945 -13868 0
 13865  13866 -13867 -945  13869 0
 13865  13866 -13867 -945 -13870 0

c  2+1 --> break 
c    (-b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧  p_945) -> break
c  in CNF:
c     b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 13865 -13866  13867 -945 1162 0


c  2-1 --> 1
c    (-b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧ -p_945) -> (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0)
c  in CNF:
c     b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_2
c     b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_1
c     b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨  b^{21, 46}_0
c  in DIMACS:
 13865 -13866  13867  945 -13868 0
 13865 -13866  13867  945 -13869 0
 13865 -13866  13867  945  13870 0

c  1-1 --> 0
c    (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0 ∧ -p_945) -> (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧ -b^{21, 46}_0)
c  in CNF:
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_2
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_1
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_0
c  in DIMACS:
 13865  13866 -13867  945 -13868 0
 13865  13866 -13867  945 -13869 0
 13865  13866 -13867  945 -13870 0

c  0-1 --> -1
c    (-b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧ -p_945) -> ( b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0)
c  in CNF:
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨  b^{21, 46}_2
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_1
c     b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨  b^{21, 46}_0
c  in DIMACS:
 13865  13866  13867  945  13868 0
 13865  13866  13867  945 -13869 0
 13865  13866  13867  945  13870 0

c  -1-1 --> -2
c    ( b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧  b^{21, 45}_0 ∧ -p_945) -> ( b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0)
c  in CNF:
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨  b^{21, 46}_2
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨  b^{21, 46}_1
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨  p_945 ∨ -b^{21, 46}_0
c  in DIMACS:
-13865  13866 -13867  945  13868 0
-13865  13866 -13867  945  13869 0
-13865  13866 -13867  945 -13870 0

c  -2-1 --> break 
c    ( b^{21, 45}_2 ∧  b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨  b^{21, 45}_0 ∨  p_945 ∨ break
c  in DIMACS:
-13865 -13866  13867  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 45}_2 ∧ -b^{21, 45}_1 ∧ -b^{21, 45}_0 ∧ true) 
c  in CNF:
c    -b^{21, 45}_2 ∨  b^{21, 45}_1 ∨  b^{21, 45}_0 ∨ false 
c  in DIMACS:
-13865  13866  13867  0

c  3 does not represent an automaton state.
c    -(-b^{21, 45}_2 ∧  b^{21, 45}_1 ∧  b^{21, 45}_0 ∧ true) 
c  in CNF:
c     b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ false 
c  in DIMACS:
 13865 -13866 -13867  0
c  -3 does not represent an automaton state.
c    -( b^{21, 45}_2 ∧  b^{21, 45}_1 ∧  b^{21, 45}_0 ∧ true) 
c  in CNF:
c    -b^{21, 45}_2 ∨ -b^{21, 45}_1 ∨ -b^{21, 45}_0 ∨ false 
c  in DIMACS:
-13865 -13866 -13867  0

c i = 46
c  -2+1 --> -1
c    ( b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧  p_966) -> ( b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0)
c  in CNF:
c    -b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨  b^{21, 47}_2
c    -b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_1
c    -b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨  b^{21, 47}_0
c  in DIMACS:
-13868 -13869  13870 -966  13871 0
-13868 -13869  13870 -966 -13872 0
-13868 -13869  13870 -966  13873 0

c  -1+1 --> 0
c    ( b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0 ∧  p_966) -> (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧ -b^{21, 47}_0)
c  in CNF:
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_2
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_1
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_0
c  in DIMACS:
-13868  13869 -13870 -966 -13871 0
-13868  13869 -13870 -966 -13872 0
-13868  13869 -13870 -966 -13873 0

c  0+1 --> 1
c    (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧  p_966) -> (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0)
c  in CNF:
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_2
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_1
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨  b^{21, 47}_0
c  in DIMACS:
 13868  13869  13870 -966 -13871 0
 13868  13869  13870 -966 -13872 0
 13868  13869  13870 -966  13873 0

c  1+1 --> 2
c    (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0 ∧  p_966) -> (-b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0)
c  in CNF:
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_2
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨  b^{21, 47}_1
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ -p_966 ∨ -b^{21, 47}_0
c  in DIMACS:
 13868  13869 -13870 -966 -13871 0
 13868  13869 -13870 -966  13872 0
 13868  13869 -13870 -966 -13873 0

c  2+1 --> break 
c    (-b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧  p_966) -> break
c  in CNF:
c     b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 13868 -13869  13870 -966 1162 0


c  2-1 --> 1
c    (-b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧ -p_966) -> (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0)
c  in CNF:
c     b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_2
c     b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_1
c     b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨  b^{21, 47}_0
c  in DIMACS:
 13868 -13869  13870  966 -13871 0
 13868 -13869  13870  966 -13872 0
 13868 -13869  13870  966  13873 0

c  1-1 --> 0
c    (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0 ∧ -p_966) -> (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧ -b^{21, 47}_0)
c  in CNF:
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_2
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_1
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_0
c  in DIMACS:
 13868  13869 -13870  966 -13871 0
 13868  13869 -13870  966 -13872 0
 13868  13869 -13870  966 -13873 0

c  0-1 --> -1
c    (-b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧ -p_966) -> ( b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0)
c  in CNF:
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨  b^{21, 47}_2
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_1
c     b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨  b^{21, 47}_0
c  in DIMACS:
 13868  13869  13870  966  13871 0
 13868  13869  13870  966 -13872 0
 13868  13869  13870  966  13873 0

c  -1-1 --> -2
c    ( b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧  b^{21, 46}_0 ∧ -p_966) -> ( b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0)
c  in CNF:
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨  b^{21, 47}_2
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨  b^{21, 47}_1
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨  p_966 ∨ -b^{21, 47}_0
c  in DIMACS:
-13868  13869 -13870  966  13871 0
-13868  13869 -13870  966  13872 0
-13868  13869 -13870  966 -13873 0

c  -2-1 --> break 
c    ( b^{21, 46}_2 ∧  b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨  b^{21, 46}_0 ∨  p_966 ∨ break
c  in DIMACS:
-13868 -13869  13870  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 46}_2 ∧ -b^{21, 46}_1 ∧ -b^{21, 46}_0 ∧ true) 
c  in CNF:
c    -b^{21, 46}_2 ∨  b^{21, 46}_1 ∨  b^{21, 46}_0 ∨ false 
c  in DIMACS:
-13868  13869  13870  0

c  3 does not represent an automaton state.
c    -(-b^{21, 46}_2 ∧  b^{21, 46}_1 ∧  b^{21, 46}_0 ∧ true) 
c  in CNF:
c     b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ false 
c  in DIMACS:
 13868 -13869 -13870  0
c  -3 does not represent an automaton state.
c    -( b^{21, 46}_2 ∧  b^{21, 46}_1 ∧  b^{21, 46}_0 ∧ true) 
c  in CNF:
c    -b^{21, 46}_2 ∨ -b^{21, 46}_1 ∨ -b^{21, 46}_0 ∨ false 
c  in DIMACS:
-13868 -13869 -13870  0

c i = 47
c  -2+1 --> -1
c    ( b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧  p_987) -> ( b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0)
c  in CNF:
c    -b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨  b^{21, 48}_2
c    -b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_1
c    -b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨  b^{21, 48}_0
c  in DIMACS:
-13871 -13872  13873 -987  13874 0
-13871 -13872  13873 -987 -13875 0
-13871 -13872  13873 -987  13876 0

c  -1+1 --> 0
c    ( b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0 ∧  p_987) -> (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧ -b^{21, 48}_0)
c  in CNF:
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_2
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_1
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_0
c  in DIMACS:
-13871  13872 -13873 -987 -13874 0
-13871  13872 -13873 -987 -13875 0
-13871  13872 -13873 -987 -13876 0

c  0+1 --> 1
c    (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧  p_987) -> (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0)
c  in CNF:
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_2
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_1
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨  b^{21, 48}_0
c  in DIMACS:
 13871  13872  13873 -987 -13874 0
 13871  13872  13873 -987 -13875 0
 13871  13872  13873 -987  13876 0

c  1+1 --> 2
c    (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0 ∧  p_987) -> (-b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0)
c  in CNF:
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_2
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨  b^{21, 48}_1
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ -p_987 ∨ -b^{21, 48}_0
c  in DIMACS:
 13871  13872 -13873 -987 -13874 0
 13871  13872 -13873 -987  13875 0
 13871  13872 -13873 -987 -13876 0

c  2+1 --> break 
c    (-b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧  p_987) -> break
c  in CNF:
c     b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 13871 -13872  13873 -987 1162 0


c  2-1 --> 1
c    (-b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧ -p_987) -> (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0)
c  in CNF:
c     b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_2
c     b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_1
c     b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨  b^{21, 48}_0
c  in DIMACS:
 13871 -13872  13873  987 -13874 0
 13871 -13872  13873  987 -13875 0
 13871 -13872  13873  987  13876 0

c  1-1 --> 0
c    (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0 ∧ -p_987) -> (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧ -b^{21, 48}_0)
c  in CNF:
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_2
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_1
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_0
c  in DIMACS:
 13871  13872 -13873  987 -13874 0
 13871  13872 -13873  987 -13875 0
 13871  13872 -13873  987 -13876 0

c  0-1 --> -1
c    (-b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧ -p_987) -> ( b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0)
c  in CNF:
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨  b^{21, 48}_2
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_1
c     b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨  b^{21, 48}_0
c  in DIMACS:
 13871  13872  13873  987  13874 0
 13871  13872  13873  987 -13875 0
 13871  13872  13873  987  13876 0

c  -1-1 --> -2
c    ( b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧  b^{21, 47}_0 ∧ -p_987) -> ( b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0)
c  in CNF:
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨  b^{21, 48}_2
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨  b^{21, 48}_1
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨  p_987 ∨ -b^{21, 48}_0
c  in DIMACS:
-13871  13872 -13873  987  13874 0
-13871  13872 -13873  987  13875 0
-13871  13872 -13873  987 -13876 0

c  -2-1 --> break 
c    ( b^{21, 47}_2 ∧  b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨  b^{21, 47}_0 ∨  p_987 ∨ break
c  in DIMACS:
-13871 -13872  13873  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 47}_2 ∧ -b^{21, 47}_1 ∧ -b^{21, 47}_0 ∧ true) 
c  in CNF:
c    -b^{21, 47}_2 ∨  b^{21, 47}_1 ∨  b^{21, 47}_0 ∨ false 
c  in DIMACS:
-13871  13872  13873  0

c  3 does not represent an automaton state.
c    -(-b^{21, 47}_2 ∧  b^{21, 47}_1 ∧  b^{21, 47}_0 ∧ true) 
c  in CNF:
c     b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ false 
c  in DIMACS:
 13871 -13872 -13873  0
c  -3 does not represent an automaton state.
c    -( b^{21, 47}_2 ∧  b^{21, 47}_1 ∧  b^{21, 47}_0 ∧ true) 
c  in CNF:
c    -b^{21, 47}_2 ∨ -b^{21, 47}_1 ∨ -b^{21, 47}_0 ∨ false 
c  in DIMACS:
-13871 -13872 -13873  0

c i = 48
c  -2+1 --> -1
c    ( b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧  p_1008) -> ( b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0)
c  in CNF:
c    -b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨  b^{21, 49}_2
c    -b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_1
c    -b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨  b^{21, 49}_0
c  in DIMACS:
-13874 -13875  13876 -1008  13877 0
-13874 -13875  13876 -1008 -13878 0
-13874 -13875  13876 -1008  13879 0

c  -1+1 --> 0
c    ( b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0 ∧  p_1008) -> (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧ -b^{21, 49}_0)
c  in CNF:
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_2
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_1
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_0
c  in DIMACS:
-13874  13875 -13876 -1008 -13877 0
-13874  13875 -13876 -1008 -13878 0
-13874  13875 -13876 -1008 -13879 0

c  0+1 --> 1
c    (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧  p_1008) -> (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0)
c  in CNF:
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_2
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_1
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨  b^{21, 49}_0
c  in DIMACS:
 13874  13875  13876 -1008 -13877 0
 13874  13875  13876 -1008 -13878 0
 13874  13875  13876 -1008  13879 0

c  1+1 --> 2
c    (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0 ∧  p_1008) -> (-b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0)
c  in CNF:
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_2
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨  b^{21, 49}_1
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ -p_1008 ∨ -b^{21, 49}_0
c  in DIMACS:
 13874  13875 -13876 -1008 -13877 0
 13874  13875 -13876 -1008  13878 0
 13874  13875 -13876 -1008 -13879 0

c  2+1 --> break 
c    (-b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 13874 -13875  13876 -1008 1162 0


c  2-1 --> 1
c    (-b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧ -p_1008) -> (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0)
c  in CNF:
c     b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_2
c     b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_1
c     b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨  b^{21, 49}_0
c  in DIMACS:
 13874 -13875  13876  1008 -13877 0
 13874 -13875  13876  1008 -13878 0
 13874 -13875  13876  1008  13879 0

c  1-1 --> 0
c    (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0 ∧ -p_1008) -> (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧ -b^{21, 49}_0)
c  in CNF:
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_2
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_1
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_0
c  in DIMACS:
 13874  13875 -13876  1008 -13877 0
 13874  13875 -13876  1008 -13878 0
 13874  13875 -13876  1008 -13879 0

c  0-1 --> -1
c    (-b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧ -p_1008) -> ( b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0)
c  in CNF:
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨  b^{21, 49}_2
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_1
c     b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨  b^{21, 49}_0
c  in DIMACS:
 13874  13875  13876  1008  13877 0
 13874  13875  13876  1008 -13878 0
 13874  13875  13876  1008  13879 0

c  -1-1 --> -2
c    ( b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧  b^{21, 48}_0 ∧ -p_1008) -> ( b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0)
c  in CNF:
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨  b^{21, 49}_2
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨  b^{21, 49}_1
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨  p_1008 ∨ -b^{21, 49}_0
c  in DIMACS:
-13874  13875 -13876  1008  13877 0
-13874  13875 -13876  1008  13878 0
-13874  13875 -13876  1008 -13879 0

c  -2-1 --> break 
c    ( b^{21, 48}_2 ∧  b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨  b^{21, 48}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-13874 -13875  13876  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 48}_2 ∧ -b^{21, 48}_1 ∧ -b^{21, 48}_0 ∧ true) 
c  in CNF:
c    -b^{21, 48}_2 ∨  b^{21, 48}_1 ∨  b^{21, 48}_0 ∨ false 
c  in DIMACS:
-13874  13875  13876  0

c  3 does not represent an automaton state.
c    -(-b^{21, 48}_2 ∧  b^{21, 48}_1 ∧  b^{21, 48}_0 ∧ true) 
c  in CNF:
c     b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ false 
c  in DIMACS:
 13874 -13875 -13876  0
c  -3 does not represent an automaton state.
c    -( b^{21, 48}_2 ∧  b^{21, 48}_1 ∧  b^{21, 48}_0 ∧ true) 
c  in CNF:
c    -b^{21, 48}_2 ∨ -b^{21, 48}_1 ∨ -b^{21, 48}_0 ∨ false 
c  in DIMACS:
-13874 -13875 -13876  0

c i = 49
c  -2+1 --> -1
c    ( b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧  p_1029) -> ( b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0)
c  in CNF:
c    -b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨  b^{21, 50}_2
c    -b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_1
c    -b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨  b^{21, 50}_0
c  in DIMACS:
-13877 -13878  13879 -1029  13880 0
-13877 -13878  13879 -1029 -13881 0
-13877 -13878  13879 -1029  13882 0

c  -1+1 --> 0
c    ( b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0 ∧  p_1029) -> (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧ -b^{21, 50}_0)
c  in CNF:
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_2
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_1
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_0
c  in DIMACS:
-13877  13878 -13879 -1029 -13880 0
-13877  13878 -13879 -1029 -13881 0
-13877  13878 -13879 -1029 -13882 0

c  0+1 --> 1
c    (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧  p_1029) -> (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0)
c  in CNF:
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_2
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_1
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨  b^{21, 50}_0
c  in DIMACS:
 13877  13878  13879 -1029 -13880 0
 13877  13878  13879 -1029 -13881 0
 13877  13878  13879 -1029  13882 0

c  1+1 --> 2
c    (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0 ∧  p_1029) -> (-b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0)
c  in CNF:
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_2
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨  b^{21, 50}_1
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ -p_1029 ∨ -b^{21, 50}_0
c  in DIMACS:
 13877  13878 -13879 -1029 -13880 0
 13877  13878 -13879 -1029  13881 0
 13877  13878 -13879 -1029 -13882 0

c  2+1 --> break 
c    (-b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 13877 -13878  13879 -1029 1162 0


c  2-1 --> 1
c    (-b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧ -p_1029) -> (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0)
c  in CNF:
c     b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_2
c     b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_1
c     b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨  b^{21, 50}_0
c  in DIMACS:
 13877 -13878  13879  1029 -13880 0
 13877 -13878  13879  1029 -13881 0
 13877 -13878  13879  1029  13882 0

c  1-1 --> 0
c    (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0 ∧ -p_1029) -> (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧ -b^{21, 50}_0)
c  in CNF:
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_2
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_1
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_0
c  in DIMACS:
 13877  13878 -13879  1029 -13880 0
 13877  13878 -13879  1029 -13881 0
 13877  13878 -13879  1029 -13882 0

c  0-1 --> -1
c    (-b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧ -p_1029) -> ( b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0)
c  in CNF:
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨  b^{21, 50}_2
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_1
c     b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨  b^{21, 50}_0
c  in DIMACS:
 13877  13878  13879  1029  13880 0
 13877  13878  13879  1029 -13881 0
 13877  13878  13879  1029  13882 0

c  -1-1 --> -2
c    ( b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧  b^{21, 49}_0 ∧ -p_1029) -> ( b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0)
c  in CNF:
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨  b^{21, 50}_2
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨  b^{21, 50}_1
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨  p_1029 ∨ -b^{21, 50}_0
c  in DIMACS:
-13877  13878 -13879  1029  13880 0
-13877  13878 -13879  1029  13881 0
-13877  13878 -13879  1029 -13882 0

c  -2-1 --> break 
c    ( b^{21, 49}_2 ∧  b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨  b^{21, 49}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-13877 -13878  13879  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 49}_2 ∧ -b^{21, 49}_1 ∧ -b^{21, 49}_0 ∧ true) 
c  in CNF:
c    -b^{21, 49}_2 ∨  b^{21, 49}_1 ∨  b^{21, 49}_0 ∨ false 
c  in DIMACS:
-13877  13878  13879  0

c  3 does not represent an automaton state.
c    -(-b^{21, 49}_2 ∧  b^{21, 49}_1 ∧  b^{21, 49}_0 ∧ true) 
c  in CNF:
c     b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ false 
c  in DIMACS:
 13877 -13878 -13879  0
c  -3 does not represent an automaton state.
c    -( b^{21, 49}_2 ∧  b^{21, 49}_1 ∧  b^{21, 49}_0 ∧ true) 
c  in CNF:
c    -b^{21, 49}_2 ∨ -b^{21, 49}_1 ∨ -b^{21, 49}_0 ∨ false 
c  in DIMACS:
-13877 -13878 -13879  0

c i = 50
c  -2+1 --> -1
c    ( b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧  p_1050) -> ( b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0)
c  in CNF:
c    -b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨  b^{21, 51}_2
c    -b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_1
c    -b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨  b^{21, 51}_0
c  in DIMACS:
-13880 -13881  13882 -1050  13883 0
-13880 -13881  13882 -1050 -13884 0
-13880 -13881  13882 -1050  13885 0

c  -1+1 --> 0
c    ( b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0 ∧  p_1050) -> (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧ -b^{21, 51}_0)
c  in CNF:
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_2
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_1
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_0
c  in DIMACS:
-13880  13881 -13882 -1050 -13883 0
-13880  13881 -13882 -1050 -13884 0
-13880  13881 -13882 -1050 -13885 0

c  0+1 --> 1
c    (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧  p_1050) -> (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0)
c  in CNF:
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_2
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_1
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨  b^{21, 51}_0
c  in DIMACS:
 13880  13881  13882 -1050 -13883 0
 13880  13881  13882 -1050 -13884 0
 13880  13881  13882 -1050  13885 0

c  1+1 --> 2
c    (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0 ∧  p_1050) -> (-b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0)
c  in CNF:
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_2
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨  b^{21, 51}_1
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ -p_1050 ∨ -b^{21, 51}_0
c  in DIMACS:
 13880  13881 -13882 -1050 -13883 0
 13880  13881 -13882 -1050  13884 0
 13880  13881 -13882 -1050 -13885 0

c  2+1 --> break 
c    (-b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 13880 -13881  13882 -1050 1162 0


c  2-1 --> 1
c    (-b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧ -p_1050) -> (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0)
c  in CNF:
c     b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_2
c     b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_1
c     b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨  b^{21, 51}_0
c  in DIMACS:
 13880 -13881  13882  1050 -13883 0
 13880 -13881  13882  1050 -13884 0
 13880 -13881  13882  1050  13885 0

c  1-1 --> 0
c    (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0 ∧ -p_1050) -> (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧ -b^{21, 51}_0)
c  in CNF:
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_2
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_1
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_0
c  in DIMACS:
 13880  13881 -13882  1050 -13883 0
 13880  13881 -13882  1050 -13884 0
 13880  13881 -13882  1050 -13885 0

c  0-1 --> -1
c    (-b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧ -p_1050) -> ( b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0)
c  in CNF:
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨  b^{21, 51}_2
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_1
c     b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨  b^{21, 51}_0
c  in DIMACS:
 13880  13881  13882  1050  13883 0
 13880  13881  13882  1050 -13884 0
 13880  13881  13882  1050  13885 0

c  -1-1 --> -2
c    ( b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧  b^{21, 50}_0 ∧ -p_1050) -> ( b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0)
c  in CNF:
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨  b^{21, 51}_2
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨  b^{21, 51}_1
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨  p_1050 ∨ -b^{21, 51}_0
c  in DIMACS:
-13880  13881 -13882  1050  13883 0
-13880  13881 -13882  1050  13884 0
-13880  13881 -13882  1050 -13885 0

c  -2-1 --> break 
c    ( b^{21, 50}_2 ∧  b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨  b^{21, 50}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-13880 -13881  13882  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 50}_2 ∧ -b^{21, 50}_1 ∧ -b^{21, 50}_0 ∧ true) 
c  in CNF:
c    -b^{21, 50}_2 ∨  b^{21, 50}_1 ∨  b^{21, 50}_0 ∨ false 
c  in DIMACS:
-13880  13881  13882  0

c  3 does not represent an automaton state.
c    -(-b^{21, 50}_2 ∧  b^{21, 50}_1 ∧  b^{21, 50}_0 ∧ true) 
c  in CNF:
c     b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ false 
c  in DIMACS:
 13880 -13881 -13882  0
c  -3 does not represent an automaton state.
c    -( b^{21, 50}_2 ∧  b^{21, 50}_1 ∧  b^{21, 50}_0 ∧ true) 
c  in CNF:
c    -b^{21, 50}_2 ∨ -b^{21, 50}_1 ∨ -b^{21, 50}_0 ∨ false 
c  in DIMACS:
-13880 -13881 -13882  0

c i = 51
c  -2+1 --> -1
c    ( b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧  p_1071) -> ( b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0)
c  in CNF:
c    -b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨  b^{21, 52}_2
c    -b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_1
c    -b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨  b^{21, 52}_0
c  in DIMACS:
-13883 -13884  13885 -1071  13886 0
-13883 -13884  13885 -1071 -13887 0
-13883 -13884  13885 -1071  13888 0

c  -1+1 --> 0
c    ( b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0 ∧  p_1071) -> (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧ -b^{21, 52}_0)
c  in CNF:
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_2
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_1
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_0
c  in DIMACS:
-13883  13884 -13885 -1071 -13886 0
-13883  13884 -13885 -1071 -13887 0
-13883  13884 -13885 -1071 -13888 0

c  0+1 --> 1
c    (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧  p_1071) -> (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0)
c  in CNF:
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_2
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_1
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨  b^{21, 52}_0
c  in DIMACS:
 13883  13884  13885 -1071 -13886 0
 13883  13884  13885 -1071 -13887 0
 13883  13884  13885 -1071  13888 0

c  1+1 --> 2
c    (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0 ∧  p_1071) -> (-b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0)
c  in CNF:
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_2
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨  b^{21, 52}_1
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ -p_1071 ∨ -b^{21, 52}_0
c  in DIMACS:
 13883  13884 -13885 -1071 -13886 0
 13883  13884 -13885 -1071  13887 0
 13883  13884 -13885 -1071 -13888 0

c  2+1 --> break 
c    (-b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 13883 -13884  13885 -1071 1162 0


c  2-1 --> 1
c    (-b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧ -p_1071) -> (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0)
c  in CNF:
c     b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_2
c     b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_1
c     b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨  b^{21, 52}_0
c  in DIMACS:
 13883 -13884  13885  1071 -13886 0
 13883 -13884  13885  1071 -13887 0
 13883 -13884  13885  1071  13888 0

c  1-1 --> 0
c    (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0 ∧ -p_1071) -> (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧ -b^{21, 52}_0)
c  in CNF:
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_2
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_1
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_0
c  in DIMACS:
 13883  13884 -13885  1071 -13886 0
 13883  13884 -13885  1071 -13887 0
 13883  13884 -13885  1071 -13888 0

c  0-1 --> -1
c    (-b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧ -p_1071) -> ( b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0)
c  in CNF:
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨  b^{21, 52}_2
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_1
c     b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨  b^{21, 52}_0
c  in DIMACS:
 13883  13884  13885  1071  13886 0
 13883  13884  13885  1071 -13887 0
 13883  13884  13885  1071  13888 0

c  -1-1 --> -2
c    ( b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧  b^{21, 51}_0 ∧ -p_1071) -> ( b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0)
c  in CNF:
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨  b^{21, 52}_2
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨  b^{21, 52}_1
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨  p_1071 ∨ -b^{21, 52}_0
c  in DIMACS:
-13883  13884 -13885  1071  13886 0
-13883  13884 -13885  1071  13887 0
-13883  13884 -13885  1071 -13888 0

c  -2-1 --> break 
c    ( b^{21, 51}_2 ∧  b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨  b^{21, 51}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-13883 -13884  13885  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 51}_2 ∧ -b^{21, 51}_1 ∧ -b^{21, 51}_0 ∧ true) 
c  in CNF:
c    -b^{21, 51}_2 ∨  b^{21, 51}_1 ∨  b^{21, 51}_0 ∨ false 
c  in DIMACS:
-13883  13884  13885  0

c  3 does not represent an automaton state.
c    -(-b^{21, 51}_2 ∧  b^{21, 51}_1 ∧  b^{21, 51}_0 ∧ true) 
c  in CNF:
c     b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ false 
c  in DIMACS:
 13883 -13884 -13885  0
c  -3 does not represent an automaton state.
c    -( b^{21, 51}_2 ∧  b^{21, 51}_1 ∧  b^{21, 51}_0 ∧ true) 
c  in CNF:
c    -b^{21, 51}_2 ∨ -b^{21, 51}_1 ∨ -b^{21, 51}_0 ∨ false 
c  in DIMACS:
-13883 -13884 -13885  0

c i = 52
c  -2+1 --> -1
c    ( b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧  p_1092) -> ( b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0)
c  in CNF:
c    -b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨  b^{21, 53}_2
c    -b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_1
c    -b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨  b^{21, 53}_0
c  in DIMACS:
-13886 -13887  13888 -1092  13889 0
-13886 -13887  13888 -1092 -13890 0
-13886 -13887  13888 -1092  13891 0

c  -1+1 --> 0
c    ( b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0 ∧  p_1092) -> (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧ -b^{21, 53}_0)
c  in CNF:
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_2
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_1
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_0
c  in DIMACS:
-13886  13887 -13888 -1092 -13889 0
-13886  13887 -13888 -1092 -13890 0
-13886  13887 -13888 -1092 -13891 0

c  0+1 --> 1
c    (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧  p_1092) -> (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0)
c  in CNF:
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_2
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_1
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨  b^{21, 53}_0
c  in DIMACS:
 13886  13887  13888 -1092 -13889 0
 13886  13887  13888 -1092 -13890 0
 13886  13887  13888 -1092  13891 0

c  1+1 --> 2
c    (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0 ∧  p_1092) -> (-b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0)
c  in CNF:
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_2
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨  b^{21, 53}_1
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ -p_1092 ∨ -b^{21, 53}_0
c  in DIMACS:
 13886  13887 -13888 -1092 -13889 0
 13886  13887 -13888 -1092  13890 0
 13886  13887 -13888 -1092 -13891 0

c  2+1 --> break 
c    (-b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 13886 -13887  13888 -1092 1162 0


c  2-1 --> 1
c    (-b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧ -p_1092) -> (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0)
c  in CNF:
c     b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_2
c     b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_1
c     b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨  b^{21, 53}_0
c  in DIMACS:
 13886 -13887  13888  1092 -13889 0
 13886 -13887  13888  1092 -13890 0
 13886 -13887  13888  1092  13891 0

c  1-1 --> 0
c    (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0 ∧ -p_1092) -> (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧ -b^{21, 53}_0)
c  in CNF:
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_2
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_1
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_0
c  in DIMACS:
 13886  13887 -13888  1092 -13889 0
 13886  13887 -13888  1092 -13890 0
 13886  13887 -13888  1092 -13891 0

c  0-1 --> -1
c    (-b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧ -p_1092) -> ( b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0)
c  in CNF:
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨  b^{21, 53}_2
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_1
c     b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨  b^{21, 53}_0
c  in DIMACS:
 13886  13887  13888  1092  13889 0
 13886  13887  13888  1092 -13890 0
 13886  13887  13888  1092  13891 0

c  -1-1 --> -2
c    ( b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧  b^{21, 52}_0 ∧ -p_1092) -> ( b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0)
c  in CNF:
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨  b^{21, 53}_2
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨  b^{21, 53}_1
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨  p_1092 ∨ -b^{21, 53}_0
c  in DIMACS:
-13886  13887 -13888  1092  13889 0
-13886  13887 -13888  1092  13890 0
-13886  13887 -13888  1092 -13891 0

c  -2-1 --> break 
c    ( b^{21, 52}_2 ∧  b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨  b^{21, 52}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-13886 -13887  13888  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 52}_2 ∧ -b^{21, 52}_1 ∧ -b^{21, 52}_0 ∧ true) 
c  in CNF:
c    -b^{21, 52}_2 ∨  b^{21, 52}_1 ∨  b^{21, 52}_0 ∨ false 
c  in DIMACS:
-13886  13887  13888  0

c  3 does not represent an automaton state.
c    -(-b^{21, 52}_2 ∧  b^{21, 52}_1 ∧  b^{21, 52}_0 ∧ true) 
c  in CNF:
c     b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ false 
c  in DIMACS:
 13886 -13887 -13888  0
c  -3 does not represent an automaton state.
c    -( b^{21, 52}_2 ∧  b^{21, 52}_1 ∧  b^{21, 52}_0 ∧ true) 
c  in CNF:
c    -b^{21, 52}_2 ∨ -b^{21, 52}_1 ∨ -b^{21, 52}_0 ∨ false 
c  in DIMACS:
-13886 -13887 -13888  0

c i = 53
c  -2+1 --> -1
c    ( b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧  p_1113) -> ( b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0)
c  in CNF:
c    -b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨  b^{21, 54}_2
c    -b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_1
c    -b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨  b^{21, 54}_0
c  in DIMACS:
-13889 -13890  13891 -1113  13892 0
-13889 -13890  13891 -1113 -13893 0
-13889 -13890  13891 -1113  13894 0

c  -1+1 --> 0
c    ( b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0 ∧  p_1113) -> (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧ -b^{21, 54}_0)
c  in CNF:
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_2
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_1
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_0
c  in DIMACS:
-13889  13890 -13891 -1113 -13892 0
-13889  13890 -13891 -1113 -13893 0
-13889  13890 -13891 -1113 -13894 0

c  0+1 --> 1
c    (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧  p_1113) -> (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0)
c  in CNF:
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_2
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_1
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨  b^{21, 54}_0
c  in DIMACS:
 13889  13890  13891 -1113 -13892 0
 13889  13890  13891 -1113 -13893 0
 13889  13890  13891 -1113  13894 0

c  1+1 --> 2
c    (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0 ∧  p_1113) -> (-b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0)
c  in CNF:
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_2
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨  b^{21, 54}_1
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ -p_1113 ∨ -b^{21, 54}_0
c  in DIMACS:
 13889  13890 -13891 -1113 -13892 0
 13889  13890 -13891 -1113  13893 0
 13889  13890 -13891 -1113 -13894 0

c  2+1 --> break 
c    (-b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 13889 -13890  13891 -1113 1162 0


c  2-1 --> 1
c    (-b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧ -p_1113) -> (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0)
c  in CNF:
c     b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_2
c     b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_1
c     b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨  b^{21, 54}_0
c  in DIMACS:
 13889 -13890  13891  1113 -13892 0
 13889 -13890  13891  1113 -13893 0
 13889 -13890  13891  1113  13894 0

c  1-1 --> 0
c    (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0 ∧ -p_1113) -> (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧ -b^{21, 54}_0)
c  in CNF:
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_2
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_1
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_0
c  in DIMACS:
 13889  13890 -13891  1113 -13892 0
 13889  13890 -13891  1113 -13893 0
 13889  13890 -13891  1113 -13894 0

c  0-1 --> -1
c    (-b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧ -p_1113) -> ( b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0)
c  in CNF:
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨  b^{21, 54}_2
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_1
c     b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨  b^{21, 54}_0
c  in DIMACS:
 13889  13890  13891  1113  13892 0
 13889  13890  13891  1113 -13893 0
 13889  13890  13891  1113  13894 0

c  -1-1 --> -2
c    ( b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧  b^{21, 53}_0 ∧ -p_1113) -> ( b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0)
c  in CNF:
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨  b^{21, 54}_2
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨  b^{21, 54}_1
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨  p_1113 ∨ -b^{21, 54}_0
c  in DIMACS:
-13889  13890 -13891  1113  13892 0
-13889  13890 -13891  1113  13893 0
-13889  13890 -13891  1113 -13894 0

c  -2-1 --> break 
c    ( b^{21, 53}_2 ∧  b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨  b^{21, 53}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-13889 -13890  13891  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 53}_2 ∧ -b^{21, 53}_1 ∧ -b^{21, 53}_0 ∧ true) 
c  in CNF:
c    -b^{21, 53}_2 ∨  b^{21, 53}_1 ∨  b^{21, 53}_0 ∨ false 
c  in DIMACS:
-13889  13890  13891  0

c  3 does not represent an automaton state.
c    -(-b^{21, 53}_2 ∧  b^{21, 53}_1 ∧  b^{21, 53}_0 ∧ true) 
c  in CNF:
c     b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ false 
c  in DIMACS:
 13889 -13890 -13891  0
c  -3 does not represent an automaton state.
c    -( b^{21, 53}_2 ∧  b^{21, 53}_1 ∧  b^{21, 53}_0 ∧ true) 
c  in CNF:
c    -b^{21, 53}_2 ∨ -b^{21, 53}_1 ∨ -b^{21, 53}_0 ∨ false 
c  in DIMACS:
-13889 -13890 -13891  0

c i = 54
c  -2+1 --> -1
c    ( b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧  p_1134) -> ( b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0)
c  in CNF:
c    -b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨  b^{21, 55}_2
c    -b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_1
c    -b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨  b^{21, 55}_0
c  in DIMACS:
-13892 -13893  13894 -1134  13895 0
-13892 -13893  13894 -1134 -13896 0
-13892 -13893  13894 -1134  13897 0

c  -1+1 --> 0
c    ( b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0 ∧  p_1134) -> (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧ -b^{21, 55}_0)
c  in CNF:
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_2
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_1
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_0
c  in DIMACS:
-13892  13893 -13894 -1134 -13895 0
-13892  13893 -13894 -1134 -13896 0
-13892  13893 -13894 -1134 -13897 0

c  0+1 --> 1
c    (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧  p_1134) -> (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0)
c  in CNF:
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_2
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_1
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨  b^{21, 55}_0
c  in DIMACS:
 13892  13893  13894 -1134 -13895 0
 13892  13893  13894 -1134 -13896 0
 13892  13893  13894 -1134  13897 0

c  1+1 --> 2
c    (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0 ∧  p_1134) -> (-b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0)
c  in CNF:
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_2
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨  b^{21, 55}_1
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ -p_1134 ∨ -b^{21, 55}_0
c  in DIMACS:
 13892  13893 -13894 -1134 -13895 0
 13892  13893 -13894 -1134  13896 0
 13892  13893 -13894 -1134 -13897 0

c  2+1 --> break 
c    (-b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 13892 -13893  13894 -1134 1162 0


c  2-1 --> 1
c    (-b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧ -p_1134) -> (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0)
c  in CNF:
c     b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_2
c     b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_1
c     b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨  b^{21, 55}_0
c  in DIMACS:
 13892 -13893  13894  1134 -13895 0
 13892 -13893  13894  1134 -13896 0
 13892 -13893  13894  1134  13897 0

c  1-1 --> 0
c    (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0 ∧ -p_1134) -> (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧ -b^{21, 55}_0)
c  in CNF:
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_2
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_1
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_0
c  in DIMACS:
 13892  13893 -13894  1134 -13895 0
 13892  13893 -13894  1134 -13896 0
 13892  13893 -13894  1134 -13897 0

c  0-1 --> -1
c    (-b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧ -p_1134) -> ( b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0)
c  in CNF:
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨  b^{21, 55}_2
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_1
c     b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨  b^{21, 55}_0
c  in DIMACS:
 13892  13893  13894  1134  13895 0
 13892  13893  13894  1134 -13896 0
 13892  13893  13894  1134  13897 0

c  -1-1 --> -2
c    ( b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧  b^{21, 54}_0 ∧ -p_1134) -> ( b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0)
c  in CNF:
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨  b^{21, 55}_2
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨  b^{21, 55}_1
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨  p_1134 ∨ -b^{21, 55}_0
c  in DIMACS:
-13892  13893 -13894  1134  13895 0
-13892  13893 -13894  1134  13896 0
-13892  13893 -13894  1134 -13897 0

c  -2-1 --> break 
c    ( b^{21, 54}_2 ∧  b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨  b^{21, 54}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-13892 -13893  13894  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 54}_2 ∧ -b^{21, 54}_1 ∧ -b^{21, 54}_0 ∧ true) 
c  in CNF:
c    -b^{21, 54}_2 ∨  b^{21, 54}_1 ∨  b^{21, 54}_0 ∨ false 
c  in DIMACS:
-13892  13893  13894  0

c  3 does not represent an automaton state.
c    -(-b^{21, 54}_2 ∧  b^{21, 54}_1 ∧  b^{21, 54}_0 ∧ true) 
c  in CNF:
c     b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ false 
c  in DIMACS:
 13892 -13893 -13894  0
c  -3 does not represent an automaton state.
c    -( b^{21, 54}_2 ∧  b^{21, 54}_1 ∧  b^{21, 54}_0 ∧ true) 
c  in CNF:
c    -b^{21, 54}_2 ∨ -b^{21, 54}_1 ∨ -b^{21, 54}_0 ∨ false 
c  in DIMACS:
-13892 -13893 -13894  0

c i = 55
c  -2+1 --> -1
c    ( b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧  p_1155) -> ( b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧  b^{21, 56}_0)
c  in CNF:
c    -b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨  b^{21, 56}_2
c    -b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_1
c    -b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨  b^{21, 56}_0
c  in DIMACS:
-13895 -13896  13897 -1155  13898 0
-13895 -13896  13897 -1155 -13899 0
-13895 -13896  13897 -1155  13900 0

c  -1+1 --> 0
c    ( b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0 ∧  p_1155) -> (-b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧ -b^{21, 56}_0)
c  in CNF:
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_2
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_1
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_0
c  in DIMACS:
-13895  13896 -13897 -1155 -13898 0
-13895  13896 -13897 -1155 -13899 0
-13895  13896 -13897 -1155 -13900 0

c  0+1 --> 1
c    (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧  p_1155) -> (-b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧  b^{21, 56}_0)
c  in CNF:
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_2
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_1
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨  b^{21, 56}_0
c  in DIMACS:
 13895  13896  13897 -1155 -13898 0
 13895  13896  13897 -1155 -13899 0
 13895  13896  13897 -1155  13900 0

c  1+1 --> 2
c    (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0 ∧  p_1155) -> (-b^{21, 56}_2 ∧  b^{21, 56}_1 ∧ -b^{21, 56}_0)
c  in CNF:
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_2
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨  b^{21, 56}_1
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ -p_1155 ∨ -b^{21, 56}_0
c  in DIMACS:
 13895  13896 -13897 -1155 -13898 0
 13895  13896 -13897 -1155  13899 0
 13895  13896 -13897 -1155 -13900 0

c  2+1 --> break 
c    (-b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 13895 -13896  13897 -1155 1162 0


c  2-1 --> 1
c    (-b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧ -p_1155) -> (-b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧  b^{21, 56}_0)
c  in CNF:
c     b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_2
c     b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_1
c     b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨  b^{21, 56}_0
c  in DIMACS:
 13895 -13896  13897  1155 -13898 0
 13895 -13896  13897  1155 -13899 0
 13895 -13896  13897  1155  13900 0

c  1-1 --> 0
c    (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0 ∧ -p_1155) -> (-b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧ -b^{21, 56}_0)
c  in CNF:
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_2
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_1
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_0
c  in DIMACS:
 13895  13896 -13897  1155 -13898 0
 13895  13896 -13897  1155 -13899 0
 13895  13896 -13897  1155 -13900 0

c  0-1 --> -1
c    (-b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧ -p_1155) -> ( b^{21, 56}_2 ∧ -b^{21, 56}_1 ∧  b^{21, 56}_0)
c  in CNF:
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨  b^{21, 56}_2
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_1
c     b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨  b^{21, 56}_0
c  in DIMACS:
 13895  13896  13897  1155  13898 0
 13895  13896  13897  1155 -13899 0
 13895  13896  13897  1155  13900 0

c  -1-1 --> -2
c    ( b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧  b^{21, 55}_0 ∧ -p_1155) -> ( b^{21, 56}_2 ∧  b^{21, 56}_1 ∧ -b^{21, 56}_0)
c  in CNF:
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨  b^{21, 56}_2
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨  b^{21, 56}_1
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨  p_1155 ∨ -b^{21, 56}_0
c  in DIMACS:
-13895  13896 -13897  1155  13898 0
-13895  13896 -13897  1155  13899 0
-13895  13896 -13897  1155 -13900 0

c  -2-1 --> break 
c    ( b^{21, 55}_2 ∧  b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨  b^{21, 55}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-13895 -13896  13897  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{21, 55}_2 ∧ -b^{21, 55}_1 ∧ -b^{21, 55}_0 ∧ true) 
c  in CNF:
c    -b^{21, 55}_2 ∨  b^{21, 55}_1 ∨  b^{21, 55}_0 ∨ false 
c  in DIMACS:
-13895  13896  13897  0

c  3 does not represent an automaton state.
c    -(-b^{21, 55}_2 ∧  b^{21, 55}_1 ∧  b^{21, 55}_0 ∧ true) 
c  in CNF:
c     b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ false 
c  in DIMACS:
 13895 -13896 -13897  0
c  -3 does not represent an automaton state.
c    -( b^{21, 55}_2 ∧  b^{21, 55}_1 ∧  b^{21, 55}_0 ∧ true) 
c  in CNF:
c    -b^{21, 55}_2 ∨ -b^{21, 55}_1 ∨ -b^{21, 55}_0 ∨ false 
c  in DIMACS:
-13895 -13896 -13897  0

c INIT for k = 22
c    -b^{22, 1}_2
c    -b^{22, 1}_1
c    -b^{22, 1}_0
c  in DIMACS:
-13901 0
-13902 0
-13903 0

c Transitions for k = 22
c i = 1
c  -2+1 --> -1
c    ( b^{22, 1}_2 ∧  b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧  p_22) -> ( b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0)
c  in CNF:
c    -b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨  b^{22, 2}_2
c    -b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_1
c    -b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨  b^{22, 2}_0
c  in DIMACS:
-13901 -13902  13903 -22  13904 0
-13901 -13902  13903 -22 -13905 0
-13901 -13902  13903 -22  13906 0

c  -1+1 --> 0
c    ( b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧  b^{22, 1}_0 ∧  p_22) -> (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧ -b^{22, 2}_0)
c  in CNF:
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_2
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_1
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_0
c  in DIMACS:
-13901  13902 -13903 -22 -13904 0
-13901  13902 -13903 -22 -13905 0
-13901  13902 -13903 -22 -13906 0

c  0+1 --> 1
c    (-b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧  p_22) -> (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0)
c  in CNF:
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_2
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_1
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨  b^{22, 2}_0
c  in DIMACS:
 13901  13902  13903 -22 -13904 0
 13901  13902  13903 -22 -13905 0
 13901  13902  13903 -22  13906 0

c  1+1 --> 2
c    (-b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧  b^{22, 1}_0 ∧  p_22) -> (-b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0)
c  in CNF:
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_2
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨  b^{22, 2}_1
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ -p_22 ∨ -b^{22, 2}_0
c  in DIMACS:
 13901  13902 -13903 -22 -13904 0
 13901  13902 -13903 -22  13905 0
 13901  13902 -13903 -22 -13906 0

c  2+1 --> break 
c    (-b^{22, 1}_2 ∧  b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧  p_22) -> break
c  in CNF:
c     b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ -p_22 ∨ break
c  in DIMACS:
 13901 -13902  13903 -22 1162 0


c  2-1 --> 1
c    (-b^{22, 1}_2 ∧  b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧ -p_22) -> (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0)
c  in CNF:
c     b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_2
c     b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_1
c     b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨  b^{22, 2}_0
c  in DIMACS:
 13901 -13902  13903  22 -13904 0
 13901 -13902  13903  22 -13905 0
 13901 -13902  13903  22  13906 0

c  1-1 --> 0
c    (-b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧  b^{22, 1}_0 ∧ -p_22) -> (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧ -b^{22, 2}_0)
c  in CNF:
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_2
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_1
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_0
c  in DIMACS:
 13901  13902 -13903  22 -13904 0
 13901  13902 -13903  22 -13905 0
 13901  13902 -13903  22 -13906 0

c  0-1 --> -1
c    (-b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧ -p_22) -> ( b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0)
c  in CNF:
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨  b^{22, 2}_2
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_1
c     b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨  b^{22, 2}_0
c  in DIMACS:
 13901  13902  13903  22  13904 0
 13901  13902  13903  22 -13905 0
 13901  13902  13903  22  13906 0

c  -1-1 --> -2
c    ( b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧  b^{22, 1}_0 ∧ -p_22) -> ( b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0)
c  in CNF:
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨  b^{22, 2}_2
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨  b^{22, 2}_1
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨  p_22 ∨ -b^{22, 2}_0
c  in DIMACS:
-13901  13902 -13903  22  13904 0
-13901  13902 -13903  22  13905 0
-13901  13902 -13903  22 -13906 0

c  -2-1 --> break 
c    ( b^{22, 1}_2 ∧  b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧ -p_22) -> break
c  in CNF:
c    -b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨  b^{22, 1}_0 ∨  p_22 ∨ break
c  in DIMACS:
-13901 -13902  13903  22 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 1}_2 ∧ -b^{22, 1}_1 ∧ -b^{22, 1}_0 ∧ true) 
c  in CNF:
c    -b^{22, 1}_2 ∨  b^{22, 1}_1 ∨  b^{22, 1}_0 ∨ false 
c  in DIMACS:
-13901  13902  13903  0

c  3 does not represent an automaton state.
c    -(-b^{22, 1}_2 ∧  b^{22, 1}_1 ∧  b^{22, 1}_0 ∧ true) 
c  in CNF:
c     b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ false 
c  in DIMACS:
 13901 -13902 -13903  0
c  -3 does not represent an automaton state.
c    -( b^{22, 1}_2 ∧  b^{22, 1}_1 ∧  b^{22, 1}_0 ∧ true) 
c  in CNF:
c    -b^{22, 1}_2 ∨ -b^{22, 1}_1 ∨ -b^{22, 1}_0 ∨ false 
c  in DIMACS:
-13901 -13902 -13903  0

c i = 2
c  -2+1 --> -1
c    ( b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧  p_44) -> ( b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0)
c  in CNF:
c    -b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨  b^{22, 3}_2
c    -b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_1
c    -b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨  b^{22, 3}_0
c  in DIMACS:
-13904 -13905  13906 -44  13907 0
-13904 -13905  13906 -44 -13908 0
-13904 -13905  13906 -44  13909 0

c  -1+1 --> 0
c    ( b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0 ∧  p_44) -> (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧ -b^{22, 3}_0)
c  in CNF:
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_2
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_1
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_0
c  in DIMACS:
-13904  13905 -13906 -44 -13907 0
-13904  13905 -13906 -44 -13908 0
-13904  13905 -13906 -44 -13909 0

c  0+1 --> 1
c    (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧  p_44) -> (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0)
c  in CNF:
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_2
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_1
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨  b^{22, 3}_0
c  in DIMACS:
 13904  13905  13906 -44 -13907 0
 13904  13905  13906 -44 -13908 0
 13904  13905  13906 -44  13909 0

c  1+1 --> 2
c    (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0 ∧  p_44) -> (-b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0)
c  in CNF:
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_2
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨  b^{22, 3}_1
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ -p_44 ∨ -b^{22, 3}_0
c  in DIMACS:
 13904  13905 -13906 -44 -13907 0
 13904  13905 -13906 -44  13908 0
 13904  13905 -13906 -44 -13909 0

c  2+1 --> break 
c    (-b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧  p_44) -> break
c  in CNF:
c     b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 13904 -13905  13906 -44 1162 0


c  2-1 --> 1
c    (-b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧ -p_44) -> (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0)
c  in CNF:
c     b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_2
c     b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_1
c     b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨  b^{22, 3}_0
c  in DIMACS:
 13904 -13905  13906  44 -13907 0
 13904 -13905  13906  44 -13908 0
 13904 -13905  13906  44  13909 0

c  1-1 --> 0
c    (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0 ∧ -p_44) -> (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧ -b^{22, 3}_0)
c  in CNF:
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_2
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_1
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_0
c  in DIMACS:
 13904  13905 -13906  44 -13907 0
 13904  13905 -13906  44 -13908 0
 13904  13905 -13906  44 -13909 0

c  0-1 --> -1
c    (-b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧ -p_44) -> ( b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0)
c  in CNF:
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨  b^{22, 3}_2
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_1
c     b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨  b^{22, 3}_0
c  in DIMACS:
 13904  13905  13906  44  13907 0
 13904  13905  13906  44 -13908 0
 13904  13905  13906  44  13909 0

c  -1-1 --> -2
c    ( b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧  b^{22, 2}_0 ∧ -p_44) -> ( b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0)
c  in CNF:
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨  b^{22, 3}_2
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨  b^{22, 3}_1
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨  p_44 ∨ -b^{22, 3}_0
c  in DIMACS:
-13904  13905 -13906  44  13907 0
-13904  13905 -13906  44  13908 0
-13904  13905 -13906  44 -13909 0

c  -2-1 --> break 
c    ( b^{22, 2}_2 ∧  b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨  b^{22, 2}_0 ∨  p_44 ∨ break
c  in DIMACS:
-13904 -13905  13906  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 2}_2 ∧ -b^{22, 2}_1 ∧ -b^{22, 2}_0 ∧ true) 
c  in CNF:
c    -b^{22, 2}_2 ∨  b^{22, 2}_1 ∨  b^{22, 2}_0 ∨ false 
c  in DIMACS:
-13904  13905  13906  0

c  3 does not represent an automaton state.
c    -(-b^{22, 2}_2 ∧  b^{22, 2}_1 ∧  b^{22, 2}_0 ∧ true) 
c  in CNF:
c     b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ false 
c  in DIMACS:
 13904 -13905 -13906  0
c  -3 does not represent an automaton state.
c    -( b^{22, 2}_2 ∧  b^{22, 2}_1 ∧  b^{22, 2}_0 ∧ true) 
c  in CNF:
c    -b^{22, 2}_2 ∨ -b^{22, 2}_1 ∨ -b^{22, 2}_0 ∨ false 
c  in DIMACS:
-13904 -13905 -13906  0

c i = 3
c  -2+1 --> -1
c    ( b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧  p_66) -> ( b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0)
c  in CNF:
c    -b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨  b^{22, 4}_2
c    -b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_1
c    -b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨  b^{22, 4}_0
c  in DIMACS:
-13907 -13908  13909 -66  13910 0
-13907 -13908  13909 -66 -13911 0
-13907 -13908  13909 -66  13912 0

c  -1+1 --> 0
c    ( b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0 ∧  p_66) -> (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧ -b^{22, 4}_0)
c  in CNF:
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_2
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_1
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_0
c  in DIMACS:
-13907  13908 -13909 -66 -13910 0
-13907  13908 -13909 -66 -13911 0
-13907  13908 -13909 -66 -13912 0

c  0+1 --> 1
c    (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧  p_66) -> (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0)
c  in CNF:
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_2
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_1
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨  b^{22, 4}_0
c  in DIMACS:
 13907  13908  13909 -66 -13910 0
 13907  13908  13909 -66 -13911 0
 13907  13908  13909 -66  13912 0

c  1+1 --> 2
c    (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0 ∧  p_66) -> (-b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0)
c  in CNF:
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_2
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨  b^{22, 4}_1
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ -p_66 ∨ -b^{22, 4}_0
c  in DIMACS:
 13907  13908 -13909 -66 -13910 0
 13907  13908 -13909 -66  13911 0
 13907  13908 -13909 -66 -13912 0

c  2+1 --> break 
c    (-b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧  p_66) -> break
c  in CNF:
c     b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 13907 -13908  13909 -66 1162 0


c  2-1 --> 1
c    (-b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧ -p_66) -> (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0)
c  in CNF:
c     b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_2
c     b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_1
c     b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨  b^{22, 4}_0
c  in DIMACS:
 13907 -13908  13909  66 -13910 0
 13907 -13908  13909  66 -13911 0
 13907 -13908  13909  66  13912 0

c  1-1 --> 0
c    (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0 ∧ -p_66) -> (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧ -b^{22, 4}_0)
c  in CNF:
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_2
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_1
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_0
c  in DIMACS:
 13907  13908 -13909  66 -13910 0
 13907  13908 -13909  66 -13911 0
 13907  13908 -13909  66 -13912 0

c  0-1 --> -1
c    (-b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧ -p_66) -> ( b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0)
c  in CNF:
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨  b^{22, 4}_2
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_1
c     b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨  b^{22, 4}_0
c  in DIMACS:
 13907  13908  13909  66  13910 0
 13907  13908  13909  66 -13911 0
 13907  13908  13909  66  13912 0

c  -1-1 --> -2
c    ( b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧  b^{22, 3}_0 ∧ -p_66) -> ( b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0)
c  in CNF:
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨  b^{22, 4}_2
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨  b^{22, 4}_1
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨  p_66 ∨ -b^{22, 4}_0
c  in DIMACS:
-13907  13908 -13909  66  13910 0
-13907  13908 -13909  66  13911 0
-13907  13908 -13909  66 -13912 0

c  -2-1 --> break 
c    ( b^{22, 3}_2 ∧  b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨  b^{22, 3}_0 ∨  p_66 ∨ break
c  in DIMACS:
-13907 -13908  13909  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 3}_2 ∧ -b^{22, 3}_1 ∧ -b^{22, 3}_0 ∧ true) 
c  in CNF:
c    -b^{22, 3}_2 ∨  b^{22, 3}_1 ∨  b^{22, 3}_0 ∨ false 
c  in DIMACS:
-13907  13908  13909  0

c  3 does not represent an automaton state.
c    -(-b^{22, 3}_2 ∧  b^{22, 3}_1 ∧  b^{22, 3}_0 ∧ true) 
c  in CNF:
c     b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ false 
c  in DIMACS:
 13907 -13908 -13909  0
c  -3 does not represent an automaton state.
c    -( b^{22, 3}_2 ∧  b^{22, 3}_1 ∧  b^{22, 3}_0 ∧ true) 
c  in CNF:
c    -b^{22, 3}_2 ∨ -b^{22, 3}_1 ∨ -b^{22, 3}_0 ∨ false 
c  in DIMACS:
-13907 -13908 -13909  0

c i = 4
c  -2+1 --> -1
c    ( b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧  p_88) -> ( b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0)
c  in CNF:
c    -b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨  b^{22, 5}_2
c    -b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_1
c    -b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨  b^{22, 5}_0
c  in DIMACS:
-13910 -13911  13912 -88  13913 0
-13910 -13911  13912 -88 -13914 0
-13910 -13911  13912 -88  13915 0

c  -1+1 --> 0
c    ( b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0 ∧  p_88) -> (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧ -b^{22, 5}_0)
c  in CNF:
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_2
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_1
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_0
c  in DIMACS:
-13910  13911 -13912 -88 -13913 0
-13910  13911 -13912 -88 -13914 0
-13910  13911 -13912 -88 -13915 0

c  0+1 --> 1
c    (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧  p_88) -> (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0)
c  in CNF:
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_2
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_1
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨  b^{22, 5}_0
c  in DIMACS:
 13910  13911  13912 -88 -13913 0
 13910  13911  13912 -88 -13914 0
 13910  13911  13912 -88  13915 0

c  1+1 --> 2
c    (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0 ∧  p_88) -> (-b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0)
c  in CNF:
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_2
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨  b^{22, 5}_1
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ -p_88 ∨ -b^{22, 5}_0
c  in DIMACS:
 13910  13911 -13912 -88 -13913 0
 13910  13911 -13912 -88  13914 0
 13910  13911 -13912 -88 -13915 0

c  2+1 --> break 
c    (-b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧  p_88) -> break
c  in CNF:
c     b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 13910 -13911  13912 -88 1162 0


c  2-1 --> 1
c    (-b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧ -p_88) -> (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0)
c  in CNF:
c     b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_2
c     b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_1
c     b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨  b^{22, 5}_0
c  in DIMACS:
 13910 -13911  13912  88 -13913 0
 13910 -13911  13912  88 -13914 0
 13910 -13911  13912  88  13915 0

c  1-1 --> 0
c    (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0 ∧ -p_88) -> (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧ -b^{22, 5}_0)
c  in CNF:
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_2
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_1
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_0
c  in DIMACS:
 13910  13911 -13912  88 -13913 0
 13910  13911 -13912  88 -13914 0
 13910  13911 -13912  88 -13915 0

c  0-1 --> -1
c    (-b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧ -p_88) -> ( b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0)
c  in CNF:
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨  b^{22, 5}_2
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_1
c     b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨  b^{22, 5}_0
c  in DIMACS:
 13910  13911  13912  88  13913 0
 13910  13911  13912  88 -13914 0
 13910  13911  13912  88  13915 0

c  -1-1 --> -2
c    ( b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧  b^{22, 4}_0 ∧ -p_88) -> ( b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0)
c  in CNF:
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨  b^{22, 5}_2
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨  b^{22, 5}_1
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨  p_88 ∨ -b^{22, 5}_0
c  in DIMACS:
-13910  13911 -13912  88  13913 0
-13910  13911 -13912  88  13914 0
-13910  13911 -13912  88 -13915 0

c  -2-1 --> break 
c    ( b^{22, 4}_2 ∧  b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨  b^{22, 4}_0 ∨  p_88 ∨ break
c  in DIMACS:
-13910 -13911  13912  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 4}_2 ∧ -b^{22, 4}_1 ∧ -b^{22, 4}_0 ∧ true) 
c  in CNF:
c    -b^{22, 4}_2 ∨  b^{22, 4}_1 ∨  b^{22, 4}_0 ∨ false 
c  in DIMACS:
-13910  13911  13912  0

c  3 does not represent an automaton state.
c    -(-b^{22, 4}_2 ∧  b^{22, 4}_1 ∧  b^{22, 4}_0 ∧ true) 
c  in CNF:
c     b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ false 
c  in DIMACS:
 13910 -13911 -13912  0
c  -3 does not represent an automaton state.
c    -( b^{22, 4}_2 ∧  b^{22, 4}_1 ∧  b^{22, 4}_0 ∧ true) 
c  in CNF:
c    -b^{22, 4}_2 ∨ -b^{22, 4}_1 ∨ -b^{22, 4}_0 ∨ false 
c  in DIMACS:
-13910 -13911 -13912  0

c i = 5
c  -2+1 --> -1
c    ( b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧  p_110) -> ( b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0)
c  in CNF:
c    -b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨  b^{22, 6}_2
c    -b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_1
c    -b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨  b^{22, 6}_0
c  in DIMACS:
-13913 -13914  13915 -110  13916 0
-13913 -13914  13915 -110 -13917 0
-13913 -13914  13915 -110  13918 0

c  -1+1 --> 0
c    ( b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0 ∧  p_110) -> (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧ -b^{22, 6}_0)
c  in CNF:
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_2
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_1
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_0
c  in DIMACS:
-13913  13914 -13915 -110 -13916 0
-13913  13914 -13915 -110 -13917 0
-13913  13914 -13915 -110 -13918 0

c  0+1 --> 1
c    (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧  p_110) -> (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0)
c  in CNF:
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_2
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_1
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨  b^{22, 6}_0
c  in DIMACS:
 13913  13914  13915 -110 -13916 0
 13913  13914  13915 -110 -13917 0
 13913  13914  13915 -110  13918 0

c  1+1 --> 2
c    (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0 ∧  p_110) -> (-b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0)
c  in CNF:
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_2
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨  b^{22, 6}_1
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ -p_110 ∨ -b^{22, 6}_0
c  in DIMACS:
 13913  13914 -13915 -110 -13916 0
 13913  13914 -13915 -110  13917 0
 13913  13914 -13915 -110 -13918 0

c  2+1 --> break 
c    (-b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧  p_110) -> break
c  in CNF:
c     b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 13913 -13914  13915 -110 1162 0


c  2-1 --> 1
c    (-b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧ -p_110) -> (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0)
c  in CNF:
c     b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_2
c     b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_1
c     b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨  b^{22, 6}_0
c  in DIMACS:
 13913 -13914  13915  110 -13916 0
 13913 -13914  13915  110 -13917 0
 13913 -13914  13915  110  13918 0

c  1-1 --> 0
c    (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0 ∧ -p_110) -> (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧ -b^{22, 6}_0)
c  in CNF:
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_2
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_1
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_0
c  in DIMACS:
 13913  13914 -13915  110 -13916 0
 13913  13914 -13915  110 -13917 0
 13913  13914 -13915  110 -13918 0

c  0-1 --> -1
c    (-b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧ -p_110) -> ( b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0)
c  in CNF:
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨  b^{22, 6}_2
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_1
c     b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨  b^{22, 6}_0
c  in DIMACS:
 13913  13914  13915  110  13916 0
 13913  13914  13915  110 -13917 0
 13913  13914  13915  110  13918 0

c  -1-1 --> -2
c    ( b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧  b^{22, 5}_0 ∧ -p_110) -> ( b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0)
c  in CNF:
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨  b^{22, 6}_2
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨  b^{22, 6}_1
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨  p_110 ∨ -b^{22, 6}_0
c  in DIMACS:
-13913  13914 -13915  110  13916 0
-13913  13914 -13915  110  13917 0
-13913  13914 -13915  110 -13918 0

c  -2-1 --> break 
c    ( b^{22, 5}_2 ∧  b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨  b^{22, 5}_0 ∨  p_110 ∨ break
c  in DIMACS:
-13913 -13914  13915  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 5}_2 ∧ -b^{22, 5}_1 ∧ -b^{22, 5}_0 ∧ true) 
c  in CNF:
c    -b^{22, 5}_2 ∨  b^{22, 5}_1 ∨  b^{22, 5}_0 ∨ false 
c  in DIMACS:
-13913  13914  13915  0

c  3 does not represent an automaton state.
c    -(-b^{22, 5}_2 ∧  b^{22, 5}_1 ∧  b^{22, 5}_0 ∧ true) 
c  in CNF:
c     b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ false 
c  in DIMACS:
 13913 -13914 -13915  0
c  -3 does not represent an automaton state.
c    -( b^{22, 5}_2 ∧  b^{22, 5}_1 ∧  b^{22, 5}_0 ∧ true) 
c  in CNF:
c    -b^{22, 5}_2 ∨ -b^{22, 5}_1 ∨ -b^{22, 5}_0 ∨ false 
c  in DIMACS:
-13913 -13914 -13915  0

c i = 6
c  -2+1 --> -1
c    ( b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧  p_132) -> ( b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0)
c  in CNF:
c    -b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨  b^{22, 7}_2
c    -b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_1
c    -b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨  b^{22, 7}_0
c  in DIMACS:
-13916 -13917  13918 -132  13919 0
-13916 -13917  13918 -132 -13920 0
-13916 -13917  13918 -132  13921 0

c  -1+1 --> 0
c    ( b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0 ∧  p_132) -> (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧ -b^{22, 7}_0)
c  in CNF:
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_2
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_1
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_0
c  in DIMACS:
-13916  13917 -13918 -132 -13919 0
-13916  13917 -13918 -132 -13920 0
-13916  13917 -13918 -132 -13921 0

c  0+1 --> 1
c    (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧  p_132) -> (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0)
c  in CNF:
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_2
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_1
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨  b^{22, 7}_0
c  in DIMACS:
 13916  13917  13918 -132 -13919 0
 13916  13917  13918 -132 -13920 0
 13916  13917  13918 -132  13921 0

c  1+1 --> 2
c    (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0 ∧  p_132) -> (-b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0)
c  in CNF:
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_2
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨  b^{22, 7}_1
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ -p_132 ∨ -b^{22, 7}_0
c  in DIMACS:
 13916  13917 -13918 -132 -13919 0
 13916  13917 -13918 -132  13920 0
 13916  13917 -13918 -132 -13921 0

c  2+1 --> break 
c    (-b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧  p_132) -> break
c  in CNF:
c     b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 13916 -13917  13918 -132 1162 0


c  2-1 --> 1
c    (-b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧ -p_132) -> (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0)
c  in CNF:
c     b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_2
c     b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_1
c     b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨  b^{22, 7}_0
c  in DIMACS:
 13916 -13917  13918  132 -13919 0
 13916 -13917  13918  132 -13920 0
 13916 -13917  13918  132  13921 0

c  1-1 --> 0
c    (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0 ∧ -p_132) -> (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧ -b^{22, 7}_0)
c  in CNF:
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_2
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_1
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_0
c  in DIMACS:
 13916  13917 -13918  132 -13919 0
 13916  13917 -13918  132 -13920 0
 13916  13917 -13918  132 -13921 0

c  0-1 --> -1
c    (-b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧ -p_132) -> ( b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0)
c  in CNF:
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨  b^{22, 7}_2
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_1
c     b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨  b^{22, 7}_0
c  in DIMACS:
 13916  13917  13918  132  13919 0
 13916  13917  13918  132 -13920 0
 13916  13917  13918  132  13921 0

c  -1-1 --> -2
c    ( b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧  b^{22, 6}_0 ∧ -p_132) -> ( b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0)
c  in CNF:
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨  b^{22, 7}_2
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨  b^{22, 7}_1
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨  p_132 ∨ -b^{22, 7}_0
c  in DIMACS:
-13916  13917 -13918  132  13919 0
-13916  13917 -13918  132  13920 0
-13916  13917 -13918  132 -13921 0

c  -2-1 --> break 
c    ( b^{22, 6}_2 ∧  b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨  b^{22, 6}_0 ∨  p_132 ∨ break
c  in DIMACS:
-13916 -13917  13918  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 6}_2 ∧ -b^{22, 6}_1 ∧ -b^{22, 6}_0 ∧ true) 
c  in CNF:
c    -b^{22, 6}_2 ∨  b^{22, 6}_1 ∨  b^{22, 6}_0 ∨ false 
c  in DIMACS:
-13916  13917  13918  0

c  3 does not represent an automaton state.
c    -(-b^{22, 6}_2 ∧  b^{22, 6}_1 ∧  b^{22, 6}_0 ∧ true) 
c  in CNF:
c     b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ false 
c  in DIMACS:
 13916 -13917 -13918  0
c  -3 does not represent an automaton state.
c    -( b^{22, 6}_2 ∧  b^{22, 6}_1 ∧  b^{22, 6}_0 ∧ true) 
c  in CNF:
c    -b^{22, 6}_2 ∨ -b^{22, 6}_1 ∨ -b^{22, 6}_0 ∨ false 
c  in DIMACS:
-13916 -13917 -13918  0

c i = 7
c  -2+1 --> -1
c    ( b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧  p_154) -> ( b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0)
c  in CNF:
c    -b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨  b^{22, 8}_2
c    -b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_1
c    -b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨  b^{22, 8}_0
c  in DIMACS:
-13919 -13920  13921 -154  13922 0
-13919 -13920  13921 -154 -13923 0
-13919 -13920  13921 -154  13924 0

c  -1+1 --> 0
c    ( b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0 ∧  p_154) -> (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧ -b^{22, 8}_0)
c  in CNF:
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_2
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_1
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_0
c  in DIMACS:
-13919  13920 -13921 -154 -13922 0
-13919  13920 -13921 -154 -13923 0
-13919  13920 -13921 -154 -13924 0

c  0+1 --> 1
c    (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧  p_154) -> (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0)
c  in CNF:
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_2
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_1
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨  b^{22, 8}_0
c  in DIMACS:
 13919  13920  13921 -154 -13922 0
 13919  13920  13921 -154 -13923 0
 13919  13920  13921 -154  13924 0

c  1+1 --> 2
c    (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0 ∧  p_154) -> (-b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0)
c  in CNF:
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_2
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨  b^{22, 8}_1
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ -p_154 ∨ -b^{22, 8}_0
c  in DIMACS:
 13919  13920 -13921 -154 -13922 0
 13919  13920 -13921 -154  13923 0
 13919  13920 -13921 -154 -13924 0

c  2+1 --> break 
c    (-b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧  p_154) -> break
c  in CNF:
c     b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 13919 -13920  13921 -154 1162 0


c  2-1 --> 1
c    (-b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧ -p_154) -> (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0)
c  in CNF:
c     b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_2
c     b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_1
c     b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨  b^{22, 8}_0
c  in DIMACS:
 13919 -13920  13921  154 -13922 0
 13919 -13920  13921  154 -13923 0
 13919 -13920  13921  154  13924 0

c  1-1 --> 0
c    (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0 ∧ -p_154) -> (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧ -b^{22, 8}_0)
c  in CNF:
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_2
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_1
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_0
c  in DIMACS:
 13919  13920 -13921  154 -13922 0
 13919  13920 -13921  154 -13923 0
 13919  13920 -13921  154 -13924 0

c  0-1 --> -1
c    (-b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧ -p_154) -> ( b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0)
c  in CNF:
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨  b^{22, 8}_2
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_1
c     b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨  b^{22, 8}_0
c  in DIMACS:
 13919  13920  13921  154  13922 0
 13919  13920  13921  154 -13923 0
 13919  13920  13921  154  13924 0

c  -1-1 --> -2
c    ( b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧  b^{22, 7}_0 ∧ -p_154) -> ( b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0)
c  in CNF:
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨  b^{22, 8}_2
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨  b^{22, 8}_1
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨  p_154 ∨ -b^{22, 8}_0
c  in DIMACS:
-13919  13920 -13921  154  13922 0
-13919  13920 -13921  154  13923 0
-13919  13920 -13921  154 -13924 0

c  -2-1 --> break 
c    ( b^{22, 7}_2 ∧  b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨  b^{22, 7}_0 ∨  p_154 ∨ break
c  in DIMACS:
-13919 -13920  13921  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 7}_2 ∧ -b^{22, 7}_1 ∧ -b^{22, 7}_0 ∧ true) 
c  in CNF:
c    -b^{22, 7}_2 ∨  b^{22, 7}_1 ∨  b^{22, 7}_0 ∨ false 
c  in DIMACS:
-13919  13920  13921  0

c  3 does not represent an automaton state.
c    -(-b^{22, 7}_2 ∧  b^{22, 7}_1 ∧  b^{22, 7}_0 ∧ true) 
c  in CNF:
c     b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ false 
c  in DIMACS:
 13919 -13920 -13921  0
c  -3 does not represent an automaton state.
c    -( b^{22, 7}_2 ∧  b^{22, 7}_1 ∧  b^{22, 7}_0 ∧ true) 
c  in CNF:
c    -b^{22, 7}_2 ∨ -b^{22, 7}_1 ∨ -b^{22, 7}_0 ∨ false 
c  in DIMACS:
-13919 -13920 -13921  0

c i = 8
c  -2+1 --> -1
c    ( b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧  p_176) -> ( b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0)
c  in CNF:
c    -b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨  b^{22, 9}_2
c    -b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_1
c    -b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨  b^{22, 9}_0
c  in DIMACS:
-13922 -13923  13924 -176  13925 0
-13922 -13923  13924 -176 -13926 0
-13922 -13923  13924 -176  13927 0

c  -1+1 --> 0
c    ( b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0 ∧  p_176) -> (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧ -b^{22, 9}_0)
c  in CNF:
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_2
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_1
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_0
c  in DIMACS:
-13922  13923 -13924 -176 -13925 0
-13922  13923 -13924 -176 -13926 0
-13922  13923 -13924 -176 -13927 0

c  0+1 --> 1
c    (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧  p_176) -> (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0)
c  in CNF:
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_2
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_1
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨  b^{22, 9}_0
c  in DIMACS:
 13922  13923  13924 -176 -13925 0
 13922  13923  13924 -176 -13926 0
 13922  13923  13924 -176  13927 0

c  1+1 --> 2
c    (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0 ∧  p_176) -> (-b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0)
c  in CNF:
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_2
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨  b^{22, 9}_1
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ -p_176 ∨ -b^{22, 9}_0
c  in DIMACS:
 13922  13923 -13924 -176 -13925 0
 13922  13923 -13924 -176  13926 0
 13922  13923 -13924 -176 -13927 0

c  2+1 --> break 
c    (-b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧  p_176) -> break
c  in CNF:
c     b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 13922 -13923  13924 -176 1162 0


c  2-1 --> 1
c    (-b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧ -p_176) -> (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0)
c  in CNF:
c     b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_2
c     b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_1
c     b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨  b^{22, 9}_0
c  in DIMACS:
 13922 -13923  13924  176 -13925 0
 13922 -13923  13924  176 -13926 0
 13922 -13923  13924  176  13927 0

c  1-1 --> 0
c    (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0 ∧ -p_176) -> (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧ -b^{22, 9}_0)
c  in CNF:
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_2
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_1
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_0
c  in DIMACS:
 13922  13923 -13924  176 -13925 0
 13922  13923 -13924  176 -13926 0
 13922  13923 -13924  176 -13927 0

c  0-1 --> -1
c    (-b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧ -p_176) -> ( b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0)
c  in CNF:
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨  b^{22, 9}_2
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_1
c     b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨  b^{22, 9}_0
c  in DIMACS:
 13922  13923  13924  176  13925 0
 13922  13923  13924  176 -13926 0
 13922  13923  13924  176  13927 0

c  -1-1 --> -2
c    ( b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧  b^{22, 8}_0 ∧ -p_176) -> ( b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0)
c  in CNF:
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨  b^{22, 9}_2
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨  b^{22, 9}_1
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨  p_176 ∨ -b^{22, 9}_0
c  in DIMACS:
-13922  13923 -13924  176  13925 0
-13922  13923 -13924  176  13926 0
-13922  13923 -13924  176 -13927 0

c  -2-1 --> break 
c    ( b^{22, 8}_2 ∧  b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨  b^{22, 8}_0 ∨  p_176 ∨ break
c  in DIMACS:
-13922 -13923  13924  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 8}_2 ∧ -b^{22, 8}_1 ∧ -b^{22, 8}_0 ∧ true) 
c  in CNF:
c    -b^{22, 8}_2 ∨  b^{22, 8}_1 ∨  b^{22, 8}_0 ∨ false 
c  in DIMACS:
-13922  13923  13924  0

c  3 does not represent an automaton state.
c    -(-b^{22, 8}_2 ∧  b^{22, 8}_1 ∧  b^{22, 8}_0 ∧ true) 
c  in CNF:
c     b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ false 
c  in DIMACS:
 13922 -13923 -13924  0
c  -3 does not represent an automaton state.
c    -( b^{22, 8}_2 ∧  b^{22, 8}_1 ∧  b^{22, 8}_0 ∧ true) 
c  in CNF:
c    -b^{22, 8}_2 ∨ -b^{22, 8}_1 ∨ -b^{22, 8}_0 ∨ false 
c  in DIMACS:
-13922 -13923 -13924  0

c i = 9
c  -2+1 --> -1
c    ( b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧  p_198) -> ( b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0)
c  in CNF:
c    -b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨  b^{22, 10}_2
c    -b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_1
c    -b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨  b^{22, 10}_0
c  in DIMACS:
-13925 -13926  13927 -198  13928 0
-13925 -13926  13927 -198 -13929 0
-13925 -13926  13927 -198  13930 0

c  -1+1 --> 0
c    ( b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0 ∧  p_198) -> (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧ -b^{22, 10}_0)
c  in CNF:
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_2
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_1
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_0
c  in DIMACS:
-13925  13926 -13927 -198 -13928 0
-13925  13926 -13927 -198 -13929 0
-13925  13926 -13927 -198 -13930 0

c  0+1 --> 1
c    (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧  p_198) -> (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0)
c  in CNF:
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_2
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_1
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨  b^{22, 10}_0
c  in DIMACS:
 13925  13926  13927 -198 -13928 0
 13925  13926  13927 -198 -13929 0
 13925  13926  13927 -198  13930 0

c  1+1 --> 2
c    (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0 ∧  p_198) -> (-b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0)
c  in CNF:
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_2
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨  b^{22, 10}_1
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ -p_198 ∨ -b^{22, 10}_0
c  in DIMACS:
 13925  13926 -13927 -198 -13928 0
 13925  13926 -13927 -198  13929 0
 13925  13926 -13927 -198 -13930 0

c  2+1 --> break 
c    (-b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧  p_198) -> break
c  in CNF:
c     b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 13925 -13926  13927 -198 1162 0


c  2-1 --> 1
c    (-b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧ -p_198) -> (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0)
c  in CNF:
c     b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_2
c     b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_1
c     b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨  b^{22, 10}_0
c  in DIMACS:
 13925 -13926  13927  198 -13928 0
 13925 -13926  13927  198 -13929 0
 13925 -13926  13927  198  13930 0

c  1-1 --> 0
c    (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0 ∧ -p_198) -> (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧ -b^{22, 10}_0)
c  in CNF:
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_2
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_1
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_0
c  in DIMACS:
 13925  13926 -13927  198 -13928 0
 13925  13926 -13927  198 -13929 0
 13925  13926 -13927  198 -13930 0

c  0-1 --> -1
c    (-b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧ -p_198) -> ( b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0)
c  in CNF:
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨  b^{22, 10}_2
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_1
c     b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨  b^{22, 10}_0
c  in DIMACS:
 13925  13926  13927  198  13928 0
 13925  13926  13927  198 -13929 0
 13925  13926  13927  198  13930 0

c  -1-1 --> -2
c    ( b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧  b^{22, 9}_0 ∧ -p_198) -> ( b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0)
c  in CNF:
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨  b^{22, 10}_2
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨  b^{22, 10}_1
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨  p_198 ∨ -b^{22, 10}_0
c  in DIMACS:
-13925  13926 -13927  198  13928 0
-13925  13926 -13927  198  13929 0
-13925  13926 -13927  198 -13930 0

c  -2-1 --> break 
c    ( b^{22, 9}_2 ∧  b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨  b^{22, 9}_0 ∨  p_198 ∨ break
c  in DIMACS:
-13925 -13926  13927  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 9}_2 ∧ -b^{22, 9}_1 ∧ -b^{22, 9}_0 ∧ true) 
c  in CNF:
c    -b^{22, 9}_2 ∨  b^{22, 9}_1 ∨  b^{22, 9}_0 ∨ false 
c  in DIMACS:
-13925  13926  13927  0

c  3 does not represent an automaton state.
c    -(-b^{22, 9}_2 ∧  b^{22, 9}_1 ∧  b^{22, 9}_0 ∧ true) 
c  in CNF:
c     b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ false 
c  in DIMACS:
 13925 -13926 -13927  0
c  -3 does not represent an automaton state.
c    -( b^{22, 9}_2 ∧  b^{22, 9}_1 ∧  b^{22, 9}_0 ∧ true) 
c  in CNF:
c    -b^{22, 9}_2 ∨ -b^{22, 9}_1 ∨ -b^{22, 9}_0 ∨ false 
c  in DIMACS:
-13925 -13926 -13927  0

c i = 10
c  -2+1 --> -1
c    ( b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧  p_220) -> ( b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0)
c  in CNF:
c    -b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨  b^{22, 11}_2
c    -b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_1
c    -b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨  b^{22, 11}_0
c  in DIMACS:
-13928 -13929  13930 -220  13931 0
-13928 -13929  13930 -220 -13932 0
-13928 -13929  13930 -220  13933 0

c  -1+1 --> 0
c    ( b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0 ∧  p_220) -> (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧ -b^{22, 11}_0)
c  in CNF:
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_2
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_1
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_0
c  in DIMACS:
-13928  13929 -13930 -220 -13931 0
-13928  13929 -13930 -220 -13932 0
-13928  13929 -13930 -220 -13933 0

c  0+1 --> 1
c    (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧  p_220) -> (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0)
c  in CNF:
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_2
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_1
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨  b^{22, 11}_0
c  in DIMACS:
 13928  13929  13930 -220 -13931 0
 13928  13929  13930 -220 -13932 0
 13928  13929  13930 -220  13933 0

c  1+1 --> 2
c    (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0 ∧  p_220) -> (-b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0)
c  in CNF:
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_2
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨  b^{22, 11}_1
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ -p_220 ∨ -b^{22, 11}_0
c  in DIMACS:
 13928  13929 -13930 -220 -13931 0
 13928  13929 -13930 -220  13932 0
 13928  13929 -13930 -220 -13933 0

c  2+1 --> break 
c    (-b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧  p_220) -> break
c  in CNF:
c     b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 13928 -13929  13930 -220 1162 0


c  2-1 --> 1
c    (-b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧ -p_220) -> (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0)
c  in CNF:
c     b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_2
c     b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_1
c     b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨  b^{22, 11}_0
c  in DIMACS:
 13928 -13929  13930  220 -13931 0
 13928 -13929  13930  220 -13932 0
 13928 -13929  13930  220  13933 0

c  1-1 --> 0
c    (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0 ∧ -p_220) -> (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧ -b^{22, 11}_0)
c  in CNF:
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_2
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_1
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_0
c  in DIMACS:
 13928  13929 -13930  220 -13931 0
 13928  13929 -13930  220 -13932 0
 13928  13929 -13930  220 -13933 0

c  0-1 --> -1
c    (-b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧ -p_220) -> ( b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0)
c  in CNF:
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨  b^{22, 11}_2
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_1
c     b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨  b^{22, 11}_0
c  in DIMACS:
 13928  13929  13930  220  13931 0
 13928  13929  13930  220 -13932 0
 13928  13929  13930  220  13933 0

c  -1-1 --> -2
c    ( b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧  b^{22, 10}_0 ∧ -p_220) -> ( b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0)
c  in CNF:
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨  b^{22, 11}_2
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨  b^{22, 11}_1
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨  p_220 ∨ -b^{22, 11}_0
c  in DIMACS:
-13928  13929 -13930  220  13931 0
-13928  13929 -13930  220  13932 0
-13928  13929 -13930  220 -13933 0

c  -2-1 --> break 
c    ( b^{22, 10}_2 ∧  b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨  b^{22, 10}_0 ∨  p_220 ∨ break
c  in DIMACS:
-13928 -13929  13930  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 10}_2 ∧ -b^{22, 10}_1 ∧ -b^{22, 10}_0 ∧ true) 
c  in CNF:
c    -b^{22, 10}_2 ∨  b^{22, 10}_1 ∨  b^{22, 10}_0 ∨ false 
c  in DIMACS:
-13928  13929  13930  0

c  3 does not represent an automaton state.
c    -(-b^{22, 10}_2 ∧  b^{22, 10}_1 ∧  b^{22, 10}_0 ∧ true) 
c  in CNF:
c     b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ false 
c  in DIMACS:
 13928 -13929 -13930  0
c  -3 does not represent an automaton state.
c    -( b^{22, 10}_2 ∧  b^{22, 10}_1 ∧  b^{22, 10}_0 ∧ true) 
c  in CNF:
c    -b^{22, 10}_2 ∨ -b^{22, 10}_1 ∨ -b^{22, 10}_0 ∨ false 
c  in DIMACS:
-13928 -13929 -13930  0

c i = 11
c  -2+1 --> -1
c    ( b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧  p_242) -> ( b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0)
c  in CNF:
c    -b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨  b^{22, 12}_2
c    -b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_1
c    -b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨  b^{22, 12}_0
c  in DIMACS:
-13931 -13932  13933 -242  13934 0
-13931 -13932  13933 -242 -13935 0
-13931 -13932  13933 -242  13936 0

c  -1+1 --> 0
c    ( b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0 ∧  p_242) -> (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧ -b^{22, 12}_0)
c  in CNF:
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_2
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_1
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_0
c  in DIMACS:
-13931  13932 -13933 -242 -13934 0
-13931  13932 -13933 -242 -13935 0
-13931  13932 -13933 -242 -13936 0

c  0+1 --> 1
c    (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧  p_242) -> (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0)
c  in CNF:
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_2
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_1
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨  b^{22, 12}_0
c  in DIMACS:
 13931  13932  13933 -242 -13934 0
 13931  13932  13933 -242 -13935 0
 13931  13932  13933 -242  13936 0

c  1+1 --> 2
c    (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0 ∧  p_242) -> (-b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0)
c  in CNF:
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_2
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨  b^{22, 12}_1
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ -p_242 ∨ -b^{22, 12}_0
c  in DIMACS:
 13931  13932 -13933 -242 -13934 0
 13931  13932 -13933 -242  13935 0
 13931  13932 -13933 -242 -13936 0

c  2+1 --> break 
c    (-b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧  p_242) -> break
c  in CNF:
c     b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 13931 -13932  13933 -242 1162 0


c  2-1 --> 1
c    (-b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧ -p_242) -> (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0)
c  in CNF:
c     b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_2
c     b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_1
c     b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨  b^{22, 12}_0
c  in DIMACS:
 13931 -13932  13933  242 -13934 0
 13931 -13932  13933  242 -13935 0
 13931 -13932  13933  242  13936 0

c  1-1 --> 0
c    (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0 ∧ -p_242) -> (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧ -b^{22, 12}_0)
c  in CNF:
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_2
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_1
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_0
c  in DIMACS:
 13931  13932 -13933  242 -13934 0
 13931  13932 -13933  242 -13935 0
 13931  13932 -13933  242 -13936 0

c  0-1 --> -1
c    (-b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧ -p_242) -> ( b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0)
c  in CNF:
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨  b^{22, 12}_2
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_1
c     b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨  b^{22, 12}_0
c  in DIMACS:
 13931  13932  13933  242  13934 0
 13931  13932  13933  242 -13935 0
 13931  13932  13933  242  13936 0

c  -1-1 --> -2
c    ( b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧  b^{22, 11}_0 ∧ -p_242) -> ( b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0)
c  in CNF:
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨  b^{22, 12}_2
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨  b^{22, 12}_1
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨  p_242 ∨ -b^{22, 12}_0
c  in DIMACS:
-13931  13932 -13933  242  13934 0
-13931  13932 -13933  242  13935 0
-13931  13932 -13933  242 -13936 0

c  -2-1 --> break 
c    ( b^{22, 11}_2 ∧  b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨  b^{22, 11}_0 ∨  p_242 ∨ break
c  in DIMACS:
-13931 -13932  13933  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 11}_2 ∧ -b^{22, 11}_1 ∧ -b^{22, 11}_0 ∧ true) 
c  in CNF:
c    -b^{22, 11}_2 ∨  b^{22, 11}_1 ∨  b^{22, 11}_0 ∨ false 
c  in DIMACS:
-13931  13932  13933  0

c  3 does not represent an automaton state.
c    -(-b^{22, 11}_2 ∧  b^{22, 11}_1 ∧  b^{22, 11}_0 ∧ true) 
c  in CNF:
c     b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ false 
c  in DIMACS:
 13931 -13932 -13933  0
c  -3 does not represent an automaton state.
c    -( b^{22, 11}_2 ∧  b^{22, 11}_1 ∧  b^{22, 11}_0 ∧ true) 
c  in CNF:
c    -b^{22, 11}_2 ∨ -b^{22, 11}_1 ∨ -b^{22, 11}_0 ∨ false 
c  in DIMACS:
-13931 -13932 -13933  0

c i = 12
c  -2+1 --> -1
c    ( b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧  p_264) -> ( b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0)
c  in CNF:
c    -b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨  b^{22, 13}_2
c    -b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_1
c    -b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨  b^{22, 13}_0
c  in DIMACS:
-13934 -13935  13936 -264  13937 0
-13934 -13935  13936 -264 -13938 0
-13934 -13935  13936 -264  13939 0

c  -1+1 --> 0
c    ( b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0 ∧  p_264) -> (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧ -b^{22, 13}_0)
c  in CNF:
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_2
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_1
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_0
c  in DIMACS:
-13934  13935 -13936 -264 -13937 0
-13934  13935 -13936 -264 -13938 0
-13934  13935 -13936 -264 -13939 0

c  0+1 --> 1
c    (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧  p_264) -> (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0)
c  in CNF:
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_2
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_1
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨  b^{22, 13}_0
c  in DIMACS:
 13934  13935  13936 -264 -13937 0
 13934  13935  13936 -264 -13938 0
 13934  13935  13936 -264  13939 0

c  1+1 --> 2
c    (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0 ∧  p_264) -> (-b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0)
c  in CNF:
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_2
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨  b^{22, 13}_1
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ -p_264 ∨ -b^{22, 13}_0
c  in DIMACS:
 13934  13935 -13936 -264 -13937 0
 13934  13935 -13936 -264  13938 0
 13934  13935 -13936 -264 -13939 0

c  2+1 --> break 
c    (-b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧  p_264) -> break
c  in CNF:
c     b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 13934 -13935  13936 -264 1162 0


c  2-1 --> 1
c    (-b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧ -p_264) -> (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0)
c  in CNF:
c     b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_2
c     b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_1
c     b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨  b^{22, 13}_0
c  in DIMACS:
 13934 -13935  13936  264 -13937 0
 13934 -13935  13936  264 -13938 0
 13934 -13935  13936  264  13939 0

c  1-1 --> 0
c    (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0 ∧ -p_264) -> (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧ -b^{22, 13}_0)
c  in CNF:
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_2
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_1
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_0
c  in DIMACS:
 13934  13935 -13936  264 -13937 0
 13934  13935 -13936  264 -13938 0
 13934  13935 -13936  264 -13939 0

c  0-1 --> -1
c    (-b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧ -p_264) -> ( b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0)
c  in CNF:
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨  b^{22, 13}_2
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_1
c     b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨  b^{22, 13}_0
c  in DIMACS:
 13934  13935  13936  264  13937 0
 13934  13935  13936  264 -13938 0
 13934  13935  13936  264  13939 0

c  -1-1 --> -2
c    ( b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧  b^{22, 12}_0 ∧ -p_264) -> ( b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0)
c  in CNF:
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨  b^{22, 13}_2
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨  b^{22, 13}_1
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨  p_264 ∨ -b^{22, 13}_0
c  in DIMACS:
-13934  13935 -13936  264  13937 0
-13934  13935 -13936  264  13938 0
-13934  13935 -13936  264 -13939 0

c  -2-1 --> break 
c    ( b^{22, 12}_2 ∧  b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨  b^{22, 12}_0 ∨  p_264 ∨ break
c  in DIMACS:
-13934 -13935  13936  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 12}_2 ∧ -b^{22, 12}_1 ∧ -b^{22, 12}_0 ∧ true) 
c  in CNF:
c    -b^{22, 12}_2 ∨  b^{22, 12}_1 ∨  b^{22, 12}_0 ∨ false 
c  in DIMACS:
-13934  13935  13936  0

c  3 does not represent an automaton state.
c    -(-b^{22, 12}_2 ∧  b^{22, 12}_1 ∧  b^{22, 12}_0 ∧ true) 
c  in CNF:
c     b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ false 
c  in DIMACS:
 13934 -13935 -13936  0
c  -3 does not represent an automaton state.
c    -( b^{22, 12}_2 ∧  b^{22, 12}_1 ∧  b^{22, 12}_0 ∧ true) 
c  in CNF:
c    -b^{22, 12}_2 ∨ -b^{22, 12}_1 ∨ -b^{22, 12}_0 ∨ false 
c  in DIMACS:
-13934 -13935 -13936  0

c i = 13
c  -2+1 --> -1
c    ( b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧  p_286) -> ( b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0)
c  in CNF:
c    -b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨  b^{22, 14}_2
c    -b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_1
c    -b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨  b^{22, 14}_0
c  in DIMACS:
-13937 -13938  13939 -286  13940 0
-13937 -13938  13939 -286 -13941 0
-13937 -13938  13939 -286  13942 0

c  -1+1 --> 0
c    ( b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0 ∧  p_286) -> (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧ -b^{22, 14}_0)
c  in CNF:
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_2
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_1
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_0
c  in DIMACS:
-13937  13938 -13939 -286 -13940 0
-13937  13938 -13939 -286 -13941 0
-13937  13938 -13939 -286 -13942 0

c  0+1 --> 1
c    (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧  p_286) -> (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0)
c  in CNF:
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_2
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_1
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨  b^{22, 14}_0
c  in DIMACS:
 13937  13938  13939 -286 -13940 0
 13937  13938  13939 -286 -13941 0
 13937  13938  13939 -286  13942 0

c  1+1 --> 2
c    (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0 ∧  p_286) -> (-b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0)
c  in CNF:
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_2
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨  b^{22, 14}_1
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ -p_286 ∨ -b^{22, 14}_0
c  in DIMACS:
 13937  13938 -13939 -286 -13940 0
 13937  13938 -13939 -286  13941 0
 13937  13938 -13939 -286 -13942 0

c  2+1 --> break 
c    (-b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧  p_286) -> break
c  in CNF:
c     b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 13937 -13938  13939 -286 1162 0


c  2-1 --> 1
c    (-b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧ -p_286) -> (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0)
c  in CNF:
c     b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_2
c     b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_1
c     b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨  b^{22, 14}_0
c  in DIMACS:
 13937 -13938  13939  286 -13940 0
 13937 -13938  13939  286 -13941 0
 13937 -13938  13939  286  13942 0

c  1-1 --> 0
c    (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0 ∧ -p_286) -> (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧ -b^{22, 14}_0)
c  in CNF:
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_2
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_1
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_0
c  in DIMACS:
 13937  13938 -13939  286 -13940 0
 13937  13938 -13939  286 -13941 0
 13937  13938 -13939  286 -13942 0

c  0-1 --> -1
c    (-b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧ -p_286) -> ( b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0)
c  in CNF:
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨  b^{22, 14}_2
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_1
c     b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨  b^{22, 14}_0
c  in DIMACS:
 13937  13938  13939  286  13940 0
 13937  13938  13939  286 -13941 0
 13937  13938  13939  286  13942 0

c  -1-1 --> -2
c    ( b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧  b^{22, 13}_0 ∧ -p_286) -> ( b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0)
c  in CNF:
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨  b^{22, 14}_2
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨  b^{22, 14}_1
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨  p_286 ∨ -b^{22, 14}_0
c  in DIMACS:
-13937  13938 -13939  286  13940 0
-13937  13938 -13939  286  13941 0
-13937  13938 -13939  286 -13942 0

c  -2-1 --> break 
c    ( b^{22, 13}_2 ∧  b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨  b^{22, 13}_0 ∨  p_286 ∨ break
c  in DIMACS:
-13937 -13938  13939  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 13}_2 ∧ -b^{22, 13}_1 ∧ -b^{22, 13}_0 ∧ true) 
c  in CNF:
c    -b^{22, 13}_2 ∨  b^{22, 13}_1 ∨  b^{22, 13}_0 ∨ false 
c  in DIMACS:
-13937  13938  13939  0

c  3 does not represent an automaton state.
c    -(-b^{22, 13}_2 ∧  b^{22, 13}_1 ∧  b^{22, 13}_0 ∧ true) 
c  in CNF:
c     b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ false 
c  in DIMACS:
 13937 -13938 -13939  0
c  -3 does not represent an automaton state.
c    -( b^{22, 13}_2 ∧  b^{22, 13}_1 ∧  b^{22, 13}_0 ∧ true) 
c  in CNF:
c    -b^{22, 13}_2 ∨ -b^{22, 13}_1 ∨ -b^{22, 13}_0 ∨ false 
c  in DIMACS:
-13937 -13938 -13939  0

c i = 14
c  -2+1 --> -1
c    ( b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧  p_308) -> ( b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0)
c  in CNF:
c    -b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨  b^{22, 15}_2
c    -b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_1
c    -b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨  b^{22, 15}_0
c  in DIMACS:
-13940 -13941  13942 -308  13943 0
-13940 -13941  13942 -308 -13944 0
-13940 -13941  13942 -308  13945 0

c  -1+1 --> 0
c    ( b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0 ∧  p_308) -> (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧ -b^{22, 15}_0)
c  in CNF:
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_2
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_1
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_0
c  in DIMACS:
-13940  13941 -13942 -308 -13943 0
-13940  13941 -13942 -308 -13944 0
-13940  13941 -13942 -308 -13945 0

c  0+1 --> 1
c    (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧  p_308) -> (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0)
c  in CNF:
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_2
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_1
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨  b^{22, 15}_0
c  in DIMACS:
 13940  13941  13942 -308 -13943 0
 13940  13941  13942 -308 -13944 0
 13940  13941  13942 -308  13945 0

c  1+1 --> 2
c    (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0 ∧  p_308) -> (-b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0)
c  in CNF:
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_2
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨  b^{22, 15}_1
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ -p_308 ∨ -b^{22, 15}_0
c  in DIMACS:
 13940  13941 -13942 -308 -13943 0
 13940  13941 -13942 -308  13944 0
 13940  13941 -13942 -308 -13945 0

c  2+1 --> break 
c    (-b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧  p_308) -> break
c  in CNF:
c     b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 13940 -13941  13942 -308 1162 0


c  2-1 --> 1
c    (-b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧ -p_308) -> (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0)
c  in CNF:
c     b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_2
c     b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_1
c     b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨  b^{22, 15}_0
c  in DIMACS:
 13940 -13941  13942  308 -13943 0
 13940 -13941  13942  308 -13944 0
 13940 -13941  13942  308  13945 0

c  1-1 --> 0
c    (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0 ∧ -p_308) -> (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧ -b^{22, 15}_0)
c  in CNF:
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_2
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_1
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_0
c  in DIMACS:
 13940  13941 -13942  308 -13943 0
 13940  13941 -13942  308 -13944 0
 13940  13941 -13942  308 -13945 0

c  0-1 --> -1
c    (-b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧ -p_308) -> ( b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0)
c  in CNF:
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨  b^{22, 15}_2
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_1
c     b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨  b^{22, 15}_0
c  in DIMACS:
 13940  13941  13942  308  13943 0
 13940  13941  13942  308 -13944 0
 13940  13941  13942  308  13945 0

c  -1-1 --> -2
c    ( b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧  b^{22, 14}_0 ∧ -p_308) -> ( b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0)
c  in CNF:
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨  b^{22, 15}_2
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨  b^{22, 15}_1
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨  p_308 ∨ -b^{22, 15}_0
c  in DIMACS:
-13940  13941 -13942  308  13943 0
-13940  13941 -13942  308  13944 0
-13940  13941 -13942  308 -13945 0

c  -2-1 --> break 
c    ( b^{22, 14}_2 ∧  b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨  b^{22, 14}_0 ∨  p_308 ∨ break
c  in DIMACS:
-13940 -13941  13942  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 14}_2 ∧ -b^{22, 14}_1 ∧ -b^{22, 14}_0 ∧ true) 
c  in CNF:
c    -b^{22, 14}_2 ∨  b^{22, 14}_1 ∨  b^{22, 14}_0 ∨ false 
c  in DIMACS:
-13940  13941  13942  0

c  3 does not represent an automaton state.
c    -(-b^{22, 14}_2 ∧  b^{22, 14}_1 ∧  b^{22, 14}_0 ∧ true) 
c  in CNF:
c     b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ false 
c  in DIMACS:
 13940 -13941 -13942  0
c  -3 does not represent an automaton state.
c    -( b^{22, 14}_2 ∧  b^{22, 14}_1 ∧  b^{22, 14}_0 ∧ true) 
c  in CNF:
c    -b^{22, 14}_2 ∨ -b^{22, 14}_1 ∨ -b^{22, 14}_0 ∨ false 
c  in DIMACS:
-13940 -13941 -13942  0

c i = 15
c  -2+1 --> -1
c    ( b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧  p_330) -> ( b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0)
c  in CNF:
c    -b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨  b^{22, 16}_2
c    -b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_1
c    -b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨  b^{22, 16}_0
c  in DIMACS:
-13943 -13944  13945 -330  13946 0
-13943 -13944  13945 -330 -13947 0
-13943 -13944  13945 -330  13948 0

c  -1+1 --> 0
c    ( b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0 ∧  p_330) -> (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧ -b^{22, 16}_0)
c  in CNF:
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_2
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_1
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_0
c  in DIMACS:
-13943  13944 -13945 -330 -13946 0
-13943  13944 -13945 -330 -13947 0
-13943  13944 -13945 -330 -13948 0

c  0+1 --> 1
c    (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧  p_330) -> (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0)
c  in CNF:
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_2
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_1
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨  b^{22, 16}_0
c  in DIMACS:
 13943  13944  13945 -330 -13946 0
 13943  13944  13945 -330 -13947 0
 13943  13944  13945 -330  13948 0

c  1+1 --> 2
c    (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0 ∧  p_330) -> (-b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0)
c  in CNF:
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_2
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨  b^{22, 16}_1
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ -p_330 ∨ -b^{22, 16}_0
c  in DIMACS:
 13943  13944 -13945 -330 -13946 0
 13943  13944 -13945 -330  13947 0
 13943  13944 -13945 -330 -13948 0

c  2+1 --> break 
c    (-b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧  p_330) -> break
c  in CNF:
c     b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 13943 -13944  13945 -330 1162 0


c  2-1 --> 1
c    (-b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧ -p_330) -> (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0)
c  in CNF:
c     b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_2
c     b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_1
c     b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨  b^{22, 16}_0
c  in DIMACS:
 13943 -13944  13945  330 -13946 0
 13943 -13944  13945  330 -13947 0
 13943 -13944  13945  330  13948 0

c  1-1 --> 0
c    (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0 ∧ -p_330) -> (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧ -b^{22, 16}_0)
c  in CNF:
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_2
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_1
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_0
c  in DIMACS:
 13943  13944 -13945  330 -13946 0
 13943  13944 -13945  330 -13947 0
 13943  13944 -13945  330 -13948 0

c  0-1 --> -1
c    (-b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧ -p_330) -> ( b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0)
c  in CNF:
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨  b^{22, 16}_2
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_1
c     b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨  b^{22, 16}_0
c  in DIMACS:
 13943  13944  13945  330  13946 0
 13943  13944  13945  330 -13947 0
 13943  13944  13945  330  13948 0

c  -1-1 --> -2
c    ( b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧  b^{22, 15}_0 ∧ -p_330) -> ( b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0)
c  in CNF:
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨  b^{22, 16}_2
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨  b^{22, 16}_1
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨  p_330 ∨ -b^{22, 16}_0
c  in DIMACS:
-13943  13944 -13945  330  13946 0
-13943  13944 -13945  330  13947 0
-13943  13944 -13945  330 -13948 0

c  -2-1 --> break 
c    ( b^{22, 15}_2 ∧  b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨  b^{22, 15}_0 ∨  p_330 ∨ break
c  in DIMACS:
-13943 -13944  13945  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 15}_2 ∧ -b^{22, 15}_1 ∧ -b^{22, 15}_0 ∧ true) 
c  in CNF:
c    -b^{22, 15}_2 ∨  b^{22, 15}_1 ∨  b^{22, 15}_0 ∨ false 
c  in DIMACS:
-13943  13944  13945  0

c  3 does not represent an automaton state.
c    -(-b^{22, 15}_2 ∧  b^{22, 15}_1 ∧  b^{22, 15}_0 ∧ true) 
c  in CNF:
c     b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ false 
c  in DIMACS:
 13943 -13944 -13945  0
c  -3 does not represent an automaton state.
c    -( b^{22, 15}_2 ∧  b^{22, 15}_1 ∧  b^{22, 15}_0 ∧ true) 
c  in CNF:
c    -b^{22, 15}_2 ∨ -b^{22, 15}_1 ∨ -b^{22, 15}_0 ∨ false 
c  in DIMACS:
-13943 -13944 -13945  0

c i = 16
c  -2+1 --> -1
c    ( b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧  p_352) -> ( b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0)
c  in CNF:
c    -b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨  b^{22, 17}_2
c    -b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_1
c    -b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨  b^{22, 17}_0
c  in DIMACS:
-13946 -13947  13948 -352  13949 0
-13946 -13947  13948 -352 -13950 0
-13946 -13947  13948 -352  13951 0

c  -1+1 --> 0
c    ( b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0 ∧  p_352) -> (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧ -b^{22, 17}_0)
c  in CNF:
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_2
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_1
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_0
c  in DIMACS:
-13946  13947 -13948 -352 -13949 0
-13946  13947 -13948 -352 -13950 0
-13946  13947 -13948 -352 -13951 0

c  0+1 --> 1
c    (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧  p_352) -> (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0)
c  in CNF:
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_2
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_1
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨  b^{22, 17}_0
c  in DIMACS:
 13946  13947  13948 -352 -13949 0
 13946  13947  13948 -352 -13950 0
 13946  13947  13948 -352  13951 0

c  1+1 --> 2
c    (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0 ∧  p_352) -> (-b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0)
c  in CNF:
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_2
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨  b^{22, 17}_1
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ -p_352 ∨ -b^{22, 17}_0
c  in DIMACS:
 13946  13947 -13948 -352 -13949 0
 13946  13947 -13948 -352  13950 0
 13946  13947 -13948 -352 -13951 0

c  2+1 --> break 
c    (-b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧  p_352) -> break
c  in CNF:
c     b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 13946 -13947  13948 -352 1162 0


c  2-1 --> 1
c    (-b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧ -p_352) -> (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0)
c  in CNF:
c     b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_2
c     b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_1
c     b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨  b^{22, 17}_0
c  in DIMACS:
 13946 -13947  13948  352 -13949 0
 13946 -13947  13948  352 -13950 0
 13946 -13947  13948  352  13951 0

c  1-1 --> 0
c    (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0 ∧ -p_352) -> (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧ -b^{22, 17}_0)
c  in CNF:
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_2
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_1
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_0
c  in DIMACS:
 13946  13947 -13948  352 -13949 0
 13946  13947 -13948  352 -13950 0
 13946  13947 -13948  352 -13951 0

c  0-1 --> -1
c    (-b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧ -p_352) -> ( b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0)
c  in CNF:
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨  b^{22, 17}_2
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_1
c     b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨  b^{22, 17}_0
c  in DIMACS:
 13946  13947  13948  352  13949 0
 13946  13947  13948  352 -13950 0
 13946  13947  13948  352  13951 0

c  -1-1 --> -2
c    ( b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧  b^{22, 16}_0 ∧ -p_352) -> ( b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0)
c  in CNF:
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨  b^{22, 17}_2
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨  b^{22, 17}_1
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨  p_352 ∨ -b^{22, 17}_0
c  in DIMACS:
-13946  13947 -13948  352  13949 0
-13946  13947 -13948  352  13950 0
-13946  13947 -13948  352 -13951 0

c  -2-1 --> break 
c    ( b^{22, 16}_2 ∧  b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨  b^{22, 16}_0 ∨  p_352 ∨ break
c  in DIMACS:
-13946 -13947  13948  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 16}_2 ∧ -b^{22, 16}_1 ∧ -b^{22, 16}_0 ∧ true) 
c  in CNF:
c    -b^{22, 16}_2 ∨  b^{22, 16}_1 ∨  b^{22, 16}_0 ∨ false 
c  in DIMACS:
-13946  13947  13948  0

c  3 does not represent an automaton state.
c    -(-b^{22, 16}_2 ∧  b^{22, 16}_1 ∧  b^{22, 16}_0 ∧ true) 
c  in CNF:
c     b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ false 
c  in DIMACS:
 13946 -13947 -13948  0
c  -3 does not represent an automaton state.
c    -( b^{22, 16}_2 ∧  b^{22, 16}_1 ∧  b^{22, 16}_0 ∧ true) 
c  in CNF:
c    -b^{22, 16}_2 ∨ -b^{22, 16}_1 ∨ -b^{22, 16}_0 ∨ false 
c  in DIMACS:
-13946 -13947 -13948  0

c i = 17
c  -2+1 --> -1
c    ( b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧  p_374) -> ( b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0)
c  in CNF:
c    -b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨  b^{22, 18}_2
c    -b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_1
c    -b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨  b^{22, 18}_0
c  in DIMACS:
-13949 -13950  13951 -374  13952 0
-13949 -13950  13951 -374 -13953 0
-13949 -13950  13951 -374  13954 0

c  -1+1 --> 0
c    ( b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0 ∧  p_374) -> (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧ -b^{22, 18}_0)
c  in CNF:
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_2
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_1
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_0
c  in DIMACS:
-13949  13950 -13951 -374 -13952 0
-13949  13950 -13951 -374 -13953 0
-13949  13950 -13951 -374 -13954 0

c  0+1 --> 1
c    (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧  p_374) -> (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0)
c  in CNF:
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_2
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_1
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨  b^{22, 18}_0
c  in DIMACS:
 13949  13950  13951 -374 -13952 0
 13949  13950  13951 -374 -13953 0
 13949  13950  13951 -374  13954 0

c  1+1 --> 2
c    (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0 ∧  p_374) -> (-b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0)
c  in CNF:
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_2
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨  b^{22, 18}_1
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ -p_374 ∨ -b^{22, 18}_0
c  in DIMACS:
 13949  13950 -13951 -374 -13952 0
 13949  13950 -13951 -374  13953 0
 13949  13950 -13951 -374 -13954 0

c  2+1 --> break 
c    (-b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧  p_374) -> break
c  in CNF:
c     b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 13949 -13950  13951 -374 1162 0


c  2-1 --> 1
c    (-b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧ -p_374) -> (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0)
c  in CNF:
c     b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_2
c     b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_1
c     b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨  b^{22, 18}_0
c  in DIMACS:
 13949 -13950  13951  374 -13952 0
 13949 -13950  13951  374 -13953 0
 13949 -13950  13951  374  13954 0

c  1-1 --> 0
c    (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0 ∧ -p_374) -> (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧ -b^{22, 18}_0)
c  in CNF:
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_2
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_1
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_0
c  in DIMACS:
 13949  13950 -13951  374 -13952 0
 13949  13950 -13951  374 -13953 0
 13949  13950 -13951  374 -13954 0

c  0-1 --> -1
c    (-b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧ -p_374) -> ( b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0)
c  in CNF:
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨  b^{22, 18}_2
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_1
c     b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨  b^{22, 18}_0
c  in DIMACS:
 13949  13950  13951  374  13952 0
 13949  13950  13951  374 -13953 0
 13949  13950  13951  374  13954 0

c  -1-1 --> -2
c    ( b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧  b^{22, 17}_0 ∧ -p_374) -> ( b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0)
c  in CNF:
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨  b^{22, 18}_2
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨  b^{22, 18}_1
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨  p_374 ∨ -b^{22, 18}_0
c  in DIMACS:
-13949  13950 -13951  374  13952 0
-13949  13950 -13951  374  13953 0
-13949  13950 -13951  374 -13954 0

c  -2-1 --> break 
c    ( b^{22, 17}_2 ∧  b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨  b^{22, 17}_0 ∨  p_374 ∨ break
c  in DIMACS:
-13949 -13950  13951  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 17}_2 ∧ -b^{22, 17}_1 ∧ -b^{22, 17}_0 ∧ true) 
c  in CNF:
c    -b^{22, 17}_2 ∨  b^{22, 17}_1 ∨  b^{22, 17}_0 ∨ false 
c  in DIMACS:
-13949  13950  13951  0

c  3 does not represent an automaton state.
c    -(-b^{22, 17}_2 ∧  b^{22, 17}_1 ∧  b^{22, 17}_0 ∧ true) 
c  in CNF:
c     b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ false 
c  in DIMACS:
 13949 -13950 -13951  0
c  -3 does not represent an automaton state.
c    -( b^{22, 17}_2 ∧  b^{22, 17}_1 ∧  b^{22, 17}_0 ∧ true) 
c  in CNF:
c    -b^{22, 17}_2 ∨ -b^{22, 17}_1 ∨ -b^{22, 17}_0 ∨ false 
c  in DIMACS:
-13949 -13950 -13951  0

c i = 18
c  -2+1 --> -1
c    ( b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧  p_396) -> ( b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0)
c  in CNF:
c    -b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨  b^{22, 19}_2
c    -b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_1
c    -b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨  b^{22, 19}_0
c  in DIMACS:
-13952 -13953  13954 -396  13955 0
-13952 -13953  13954 -396 -13956 0
-13952 -13953  13954 -396  13957 0

c  -1+1 --> 0
c    ( b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0 ∧  p_396) -> (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧ -b^{22, 19}_0)
c  in CNF:
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_2
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_1
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_0
c  in DIMACS:
-13952  13953 -13954 -396 -13955 0
-13952  13953 -13954 -396 -13956 0
-13952  13953 -13954 -396 -13957 0

c  0+1 --> 1
c    (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧  p_396) -> (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0)
c  in CNF:
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_2
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_1
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨  b^{22, 19}_0
c  in DIMACS:
 13952  13953  13954 -396 -13955 0
 13952  13953  13954 -396 -13956 0
 13952  13953  13954 -396  13957 0

c  1+1 --> 2
c    (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0 ∧  p_396) -> (-b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0)
c  in CNF:
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_2
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨  b^{22, 19}_1
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ -p_396 ∨ -b^{22, 19}_0
c  in DIMACS:
 13952  13953 -13954 -396 -13955 0
 13952  13953 -13954 -396  13956 0
 13952  13953 -13954 -396 -13957 0

c  2+1 --> break 
c    (-b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧  p_396) -> break
c  in CNF:
c     b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 13952 -13953  13954 -396 1162 0


c  2-1 --> 1
c    (-b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧ -p_396) -> (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0)
c  in CNF:
c     b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_2
c     b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_1
c     b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨  b^{22, 19}_0
c  in DIMACS:
 13952 -13953  13954  396 -13955 0
 13952 -13953  13954  396 -13956 0
 13952 -13953  13954  396  13957 0

c  1-1 --> 0
c    (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0 ∧ -p_396) -> (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧ -b^{22, 19}_0)
c  in CNF:
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_2
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_1
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_0
c  in DIMACS:
 13952  13953 -13954  396 -13955 0
 13952  13953 -13954  396 -13956 0
 13952  13953 -13954  396 -13957 0

c  0-1 --> -1
c    (-b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧ -p_396) -> ( b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0)
c  in CNF:
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨  b^{22, 19}_2
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_1
c     b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨  b^{22, 19}_0
c  in DIMACS:
 13952  13953  13954  396  13955 0
 13952  13953  13954  396 -13956 0
 13952  13953  13954  396  13957 0

c  -1-1 --> -2
c    ( b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧  b^{22, 18}_0 ∧ -p_396) -> ( b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0)
c  in CNF:
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨  b^{22, 19}_2
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨  b^{22, 19}_1
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨  p_396 ∨ -b^{22, 19}_0
c  in DIMACS:
-13952  13953 -13954  396  13955 0
-13952  13953 -13954  396  13956 0
-13952  13953 -13954  396 -13957 0

c  -2-1 --> break 
c    ( b^{22, 18}_2 ∧  b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨  b^{22, 18}_0 ∨  p_396 ∨ break
c  in DIMACS:
-13952 -13953  13954  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 18}_2 ∧ -b^{22, 18}_1 ∧ -b^{22, 18}_0 ∧ true) 
c  in CNF:
c    -b^{22, 18}_2 ∨  b^{22, 18}_1 ∨  b^{22, 18}_0 ∨ false 
c  in DIMACS:
-13952  13953  13954  0

c  3 does not represent an automaton state.
c    -(-b^{22, 18}_2 ∧  b^{22, 18}_1 ∧  b^{22, 18}_0 ∧ true) 
c  in CNF:
c     b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ false 
c  in DIMACS:
 13952 -13953 -13954  0
c  -3 does not represent an automaton state.
c    -( b^{22, 18}_2 ∧  b^{22, 18}_1 ∧  b^{22, 18}_0 ∧ true) 
c  in CNF:
c    -b^{22, 18}_2 ∨ -b^{22, 18}_1 ∨ -b^{22, 18}_0 ∨ false 
c  in DIMACS:
-13952 -13953 -13954  0

c i = 19
c  -2+1 --> -1
c    ( b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧  p_418) -> ( b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0)
c  in CNF:
c    -b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨  b^{22, 20}_2
c    -b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_1
c    -b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨  b^{22, 20}_0
c  in DIMACS:
-13955 -13956  13957 -418  13958 0
-13955 -13956  13957 -418 -13959 0
-13955 -13956  13957 -418  13960 0

c  -1+1 --> 0
c    ( b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0 ∧  p_418) -> (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧ -b^{22, 20}_0)
c  in CNF:
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_2
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_1
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_0
c  in DIMACS:
-13955  13956 -13957 -418 -13958 0
-13955  13956 -13957 -418 -13959 0
-13955  13956 -13957 -418 -13960 0

c  0+1 --> 1
c    (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧  p_418) -> (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0)
c  in CNF:
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_2
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_1
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨  b^{22, 20}_0
c  in DIMACS:
 13955  13956  13957 -418 -13958 0
 13955  13956  13957 -418 -13959 0
 13955  13956  13957 -418  13960 0

c  1+1 --> 2
c    (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0 ∧  p_418) -> (-b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0)
c  in CNF:
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_2
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨  b^{22, 20}_1
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ -p_418 ∨ -b^{22, 20}_0
c  in DIMACS:
 13955  13956 -13957 -418 -13958 0
 13955  13956 -13957 -418  13959 0
 13955  13956 -13957 -418 -13960 0

c  2+1 --> break 
c    (-b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧  p_418) -> break
c  in CNF:
c     b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 13955 -13956  13957 -418 1162 0


c  2-1 --> 1
c    (-b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧ -p_418) -> (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0)
c  in CNF:
c     b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_2
c     b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_1
c     b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨  b^{22, 20}_0
c  in DIMACS:
 13955 -13956  13957  418 -13958 0
 13955 -13956  13957  418 -13959 0
 13955 -13956  13957  418  13960 0

c  1-1 --> 0
c    (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0 ∧ -p_418) -> (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧ -b^{22, 20}_0)
c  in CNF:
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_2
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_1
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_0
c  in DIMACS:
 13955  13956 -13957  418 -13958 0
 13955  13956 -13957  418 -13959 0
 13955  13956 -13957  418 -13960 0

c  0-1 --> -1
c    (-b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧ -p_418) -> ( b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0)
c  in CNF:
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨  b^{22, 20}_2
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_1
c     b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨  b^{22, 20}_0
c  in DIMACS:
 13955  13956  13957  418  13958 0
 13955  13956  13957  418 -13959 0
 13955  13956  13957  418  13960 0

c  -1-1 --> -2
c    ( b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧  b^{22, 19}_0 ∧ -p_418) -> ( b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0)
c  in CNF:
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨  b^{22, 20}_2
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨  b^{22, 20}_1
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨  p_418 ∨ -b^{22, 20}_0
c  in DIMACS:
-13955  13956 -13957  418  13958 0
-13955  13956 -13957  418  13959 0
-13955  13956 -13957  418 -13960 0

c  -2-1 --> break 
c    ( b^{22, 19}_2 ∧  b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨  b^{22, 19}_0 ∨  p_418 ∨ break
c  in DIMACS:
-13955 -13956  13957  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 19}_2 ∧ -b^{22, 19}_1 ∧ -b^{22, 19}_0 ∧ true) 
c  in CNF:
c    -b^{22, 19}_2 ∨  b^{22, 19}_1 ∨  b^{22, 19}_0 ∨ false 
c  in DIMACS:
-13955  13956  13957  0

c  3 does not represent an automaton state.
c    -(-b^{22, 19}_2 ∧  b^{22, 19}_1 ∧  b^{22, 19}_0 ∧ true) 
c  in CNF:
c     b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ false 
c  in DIMACS:
 13955 -13956 -13957  0
c  -3 does not represent an automaton state.
c    -( b^{22, 19}_2 ∧  b^{22, 19}_1 ∧  b^{22, 19}_0 ∧ true) 
c  in CNF:
c    -b^{22, 19}_2 ∨ -b^{22, 19}_1 ∨ -b^{22, 19}_0 ∨ false 
c  in DIMACS:
-13955 -13956 -13957  0

c i = 20
c  -2+1 --> -1
c    ( b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧  p_440) -> ( b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0)
c  in CNF:
c    -b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨  b^{22, 21}_2
c    -b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_1
c    -b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨  b^{22, 21}_0
c  in DIMACS:
-13958 -13959  13960 -440  13961 0
-13958 -13959  13960 -440 -13962 0
-13958 -13959  13960 -440  13963 0

c  -1+1 --> 0
c    ( b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0 ∧  p_440) -> (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧ -b^{22, 21}_0)
c  in CNF:
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_2
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_1
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_0
c  in DIMACS:
-13958  13959 -13960 -440 -13961 0
-13958  13959 -13960 -440 -13962 0
-13958  13959 -13960 -440 -13963 0

c  0+1 --> 1
c    (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧  p_440) -> (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0)
c  in CNF:
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_2
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_1
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨  b^{22, 21}_0
c  in DIMACS:
 13958  13959  13960 -440 -13961 0
 13958  13959  13960 -440 -13962 0
 13958  13959  13960 -440  13963 0

c  1+1 --> 2
c    (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0 ∧  p_440) -> (-b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0)
c  in CNF:
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_2
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨  b^{22, 21}_1
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ -p_440 ∨ -b^{22, 21}_0
c  in DIMACS:
 13958  13959 -13960 -440 -13961 0
 13958  13959 -13960 -440  13962 0
 13958  13959 -13960 -440 -13963 0

c  2+1 --> break 
c    (-b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧  p_440) -> break
c  in CNF:
c     b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 13958 -13959  13960 -440 1162 0


c  2-1 --> 1
c    (-b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧ -p_440) -> (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0)
c  in CNF:
c     b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_2
c     b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_1
c     b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨  b^{22, 21}_0
c  in DIMACS:
 13958 -13959  13960  440 -13961 0
 13958 -13959  13960  440 -13962 0
 13958 -13959  13960  440  13963 0

c  1-1 --> 0
c    (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0 ∧ -p_440) -> (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧ -b^{22, 21}_0)
c  in CNF:
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_2
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_1
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_0
c  in DIMACS:
 13958  13959 -13960  440 -13961 0
 13958  13959 -13960  440 -13962 0
 13958  13959 -13960  440 -13963 0

c  0-1 --> -1
c    (-b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧ -p_440) -> ( b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0)
c  in CNF:
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨  b^{22, 21}_2
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_1
c     b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨  b^{22, 21}_0
c  in DIMACS:
 13958  13959  13960  440  13961 0
 13958  13959  13960  440 -13962 0
 13958  13959  13960  440  13963 0

c  -1-1 --> -2
c    ( b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧  b^{22, 20}_0 ∧ -p_440) -> ( b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0)
c  in CNF:
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨  b^{22, 21}_2
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨  b^{22, 21}_1
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨  p_440 ∨ -b^{22, 21}_0
c  in DIMACS:
-13958  13959 -13960  440  13961 0
-13958  13959 -13960  440  13962 0
-13958  13959 -13960  440 -13963 0

c  -2-1 --> break 
c    ( b^{22, 20}_2 ∧  b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨  b^{22, 20}_0 ∨  p_440 ∨ break
c  in DIMACS:
-13958 -13959  13960  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 20}_2 ∧ -b^{22, 20}_1 ∧ -b^{22, 20}_0 ∧ true) 
c  in CNF:
c    -b^{22, 20}_2 ∨  b^{22, 20}_1 ∨  b^{22, 20}_0 ∨ false 
c  in DIMACS:
-13958  13959  13960  0

c  3 does not represent an automaton state.
c    -(-b^{22, 20}_2 ∧  b^{22, 20}_1 ∧  b^{22, 20}_0 ∧ true) 
c  in CNF:
c     b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ false 
c  in DIMACS:
 13958 -13959 -13960  0
c  -3 does not represent an automaton state.
c    -( b^{22, 20}_2 ∧  b^{22, 20}_1 ∧  b^{22, 20}_0 ∧ true) 
c  in CNF:
c    -b^{22, 20}_2 ∨ -b^{22, 20}_1 ∨ -b^{22, 20}_0 ∨ false 
c  in DIMACS:
-13958 -13959 -13960  0

c i = 21
c  -2+1 --> -1
c    ( b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧  p_462) -> ( b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0)
c  in CNF:
c    -b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨  b^{22, 22}_2
c    -b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_1
c    -b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨  b^{22, 22}_0
c  in DIMACS:
-13961 -13962  13963 -462  13964 0
-13961 -13962  13963 -462 -13965 0
-13961 -13962  13963 -462  13966 0

c  -1+1 --> 0
c    ( b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0 ∧  p_462) -> (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧ -b^{22, 22}_0)
c  in CNF:
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_2
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_1
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_0
c  in DIMACS:
-13961  13962 -13963 -462 -13964 0
-13961  13962 -13963 -462 -13965 0
-13961  13962 -13963 -462 -13966 0

c  0+1 --> 1
c    (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧  p_462) -> (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0)
c  in CNF:
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_2
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_1
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨  b^{22, 22}_0
c  in DIMACS:
 13961  13962  13963 -462 -13964 0
 13961  13962  13963 -462 -13965 0
 13961  13962  13963 -462  13966 0

c  1+1 --> 2
c    (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0 ∧  p_462) -> (-b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0)
c  in CNF:
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_2
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨  b^{22, 22}_1
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ -p_462 ∨ -b^{22, 22}_0
c  in DIMACS:
 13961  13962 -13963 -462 -13964 0
 13961  13962 -13963 -462  13965 0
 13961  13962 -13963 -462 -13966 0

c  2+1 --> break 
c    (-b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧  p_462) -> break
c  in CNF:
c     b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 13961 -13962  13963 -462 1162 0


c  2-1 --> 1
c    (-b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧ -p_462) -> (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0)
c  in CNF:
c     b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_2
c     b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_1
c     b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨  b^{22, 22}_0
c  in DIMACS:
 13961 -13962  13963  462 -13964 0
 13961 -13962  13963  462 -13965 0
 13961 -13962  13963  462  13966 0

c  1-1 --> 0
c    (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0 ∧ -p_462) -> (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧ -b^{22, 22}_0)
c  in CNF:
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_2
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_1
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_0
c  in DIMACS:
 13961  13962 -13963  462 -13964 0
 13961  13962 -13963  462 -13965 0
 13961  13962 -13963  462 -13966 0

c  0-1 --> -1
c    (-b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧ -p_462) -> ( b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0)
c  in CNF:
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨  b^{22, 22}_2
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_1
c     b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨  b^{22, 22}_0
c  in DIMACS:
 13961  13962  13963  462  13964 0
 13961  13962  13963  462 -13965 0
 13961  13962  13963  462  13966 0

c  -1-1 --> -2
c    ( b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧  b^{22, 21}_0 ∧ -p_462) -> ( b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0)
c  in CNF:
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨  b^{22, 22}_2
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨  b^{22, 22}_1
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨  p_462 ∨ -b^{22, 22}_0
c  in DIMACS:
-13961  13962 -13963  462  13964 0
-13961  13962 -13963  462  13965 0
-13961  13962 -13963  462 -13966 0

c  -2-1 --> break 
c    ( b^{22, 21}_2 ∧  b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨  b^{22, 21}_0 ∨  p_462 ∨ break
c  in DIMACS:
-13961 -13962  13963  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 21}_2 ∧ -b^{22, 21}_1 ∧ -b^{22, 21}_0 ∧ true) 
c  in CNF:
c    -b^{22, 21}_2 ∨  b^{22, 21}_1 ∨  b^{22, 21}_0 ∨ false 
c  in DIMACS:
-13961  13962  13963  0

c  3 does not represent an automaton state.
c    -(-b^{22, 21}_2 ∧  b^{22, 21}_1 ∧  b^{22, 21}_0 ∧ true) 
c  in CNF:
c     b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ false 
c  in DIMACS:
 13961 -13962 -13963  0
c  -3 does not represent an automaton state.
c    -( b^{22, 21}_2 ∧  b^{22, 21}_1 ∧  b^{22, 21}_0 ∧ true) 
c  in CNF:
c    -b^{22, 21}_2 ∨ -b^{22, 21}_1 ∨ -b^{22, 21}_0 ∨ false 
c  in DIMACS:
-13961 -13962 -13963  0

c i = 22
c  -2+1 --> -1
c    ( b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧  p_484) -> ( b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0)
c  in CNF:
c    -b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨  b^{22, 23}_2
c    -b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_1
c    -b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨  b^{22, 23}_0
c  in DIMACS:
-13964 -13965  13966 -484  13967 0
-13964 -13965  13966 -484 -13968 0
-13964 -13965  13966 -484  13969 0

c  -1+1 --> 0
c    ( b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0 ∧  p_484) -> (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧ -b^{22, 23}_0)
c  in CNF:
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_2
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_1
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_0
c  in DIMACS:
-13964  13965 -13966 -484 -13967 0
-13964  13965 -13966 -484 -13968 0
-13964  13965 -13966 -484 -13969 0

c  0+1 --> 1
c    (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧  p_484) -> (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0)
c  in CNF:
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_2
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_1
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨  b^{22, 23}_0
c  in DIMACS:
 13964  13965  13966 -484 -13967 0
 13964  13965  13966 -484 -13968 0
 13964  13965  13966 -484  13969 0

c  1+1 --> 2
c    (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0 ∧  p_484) -> (-b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0)
c  in CNF:
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_2
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨  b^{22, 23}_1
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ -p_484 ∨ -b^{22, 23}_0
c  in DIMACS:
 13964  13965 -13966 -484 -13967 0
 13964  13965 -13966 -484  13968 0
 13964  13965 -13966 -484 -13969 0

c  2+1 --> break 
c    (-b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧  p_484) -> break
c  in CNF:
c     b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 13964 -13965  13966 -484 1162 0


c  2-1 --> 1
c    (-b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧ -p_484) -> (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0)
c  in CNF:
c     b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_2
c     b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_1
c     b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨  b^{22, 23}_0
c  in DIMACS:
 13964 -13965  13966  484 -13967 0
 13964 -13965  13966  484 -13968 0
 13964 -13965  13966  484  13969 0

c  1-1 --> 0
c    (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0 ∧ -p_484) -> (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧ -b^{22, 23}_0)
c  in CNF:
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_2
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_1
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_0
c  in DIMACS:
 13964  13965 -13966  484 -13967 0
 13964  13965 -13966  484 -13968 0
 13964  13965 -13966  484 -13969 0

c  0-1 --> -1
c    (-b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧ -p_484) -> ( b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0)
c  in CNF:
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨  b^{22, 23}_2
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_1
c     b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨  b^{22, 23}_0
c  in DIMACS:
 13964  13965  13966  484  13967 0
 13964  13965  13966  484 -13968 0
 13964  13965  13966  484  13969 0

c  -1-1 --> -2
c    ( b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧  b^{22, 22}_0 ∧ -p_484) -> ( b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0)
c  in CNF:
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨  b^{22, 23}_2
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨  b^{22, 23}_1
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨  p_484 ∨ -b^{22, 23}_0
c  in DIMACS:
-13964  13965 -13966  484  13967 0
-13964  13965 -13966  484  13968 0
-13964  13965 -13966  484 -13969 0

c  -2-1 --> break 
c    ( b^{22, 22}_2 ∧  b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨  b^{22, 22}_0 ∨  p_484 ∨ break
c  in DIMACS:
-13964 -13965  13966  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 22}_2 ∧ -b^{22, 22}_1 ∧ -b^{22, 22}_0 ∧ true) 
c  in CNF:
c    -b^{22, 22}_2 ∨  b^{22, 22}_1 ∨  b^{22, 22}_0 ∨ false 
c  in DIMACS:
-13964  13965  13966  0

c  3 does not represent an automaton state.
c    -(-b^{22, 22}_2 ∧  b^{22, 22}_1 ∧  b^{22, 22}_0 ∧ true) 
c  in CNF:
c     b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ false 
c  in DIMACS:
 13964 -13965 -13966  0
c  -3 does not represent an automaton state.
c    -( b^{22, 22}_2 ∧  b^{22, 22}_1 ∧  b^{22, 22}_0 ∧ true) 
c  in CNF:
c    -b^{22, 22}_2 ∨ -b^{22, 22}_1 ∨ -b^{22, 22}_0 ∨ false 
c  in DIMACS:
-13964 -13965 -13966  0

c i = 23
c  -2+1 --> -1
c    ( b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧  p_506) -> ( b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0)
c  in CNF:
c    -b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨  b^{22, 24}_2
c    -b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_1
c    -b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨  b^{22, 24}_0
c  in DIMACS:
-13967 -13968  13969 -506  13970 0
-13967 -13968  13969 -506 -13971 0
-13967 -13968  13969 -506  13972 0

c  -1+1 --> 0
c    ( b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0 ∧  p_506) -> (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧ -b^{22, 24}_0)
c  in CNF:
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_2
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_1
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_0
c  in DIMACS:
-13967  13968 -13969 -506 -13970 0
-13967  13968 -13969 -506 -13971 0
-13967  13968 -13969 -506 -13972 0

c  0+1 --> 1
c    (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧  p_506) -> (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0)
c  in CNF:
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_2
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_1
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨  b^{22, 24}_0
c  in DIMACS:
 13967  13968  13969 -506 -13970 0
 13967  13968  13969 -506 -13971 0
 13967  13968  13969 -506  13972 0

c  1+1 --> 2
c    (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0 ∧  p_506) -> (-b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0)
c  in CNF:
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_2
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨  b^{22, 24}_1
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ -p_506 ∨ -b^{22, 24}_0
c  in DIMACS:
 13967  13968 -13969 -506 -13970 0
 13967  13968 -13969 -506  13971 0
 13967  13968 -13969 -506 -13972 0

c  2+1 --> break 
c    (-b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧  p_506) -> break
c  in CNF:
c     b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 13967 -13968  13969 -506 1162 0


c  2-1 --> 1
c    (-b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧ -p_506) -> (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0)
c  in CNF:
c     b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_2
c     b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_1
c     b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨  b^{22, 24}_0
c  in DIMACS:
 13967 -13968  13969  506 -13970 0
 13967 -13968  13969  506 -13971 0
 13967 -13968  13969  506  13972 0

c  1-1 --> 0
c    (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0 ∧ -p_506) -> (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧ -b^{22, 24}_0)
c  in CNF:
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_2
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_1
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_0
c  in DIMACS:
 13967  13968 -13969  506 -13970 0
 13967  13968 -13969  506 -13971 0
 13967  13968 -13969  506 -13972 0

c  0-1 --> -1
c    (-b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧ -p_506) -> ( b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0)
c  in CNF:
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨  b^{22, 24}_2
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_1
c     b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨  b^{22, 24}_0
c  in DIMACS:
 13967  13968  13969  506  13970 0
 13967  13968  13969  506 -13971 0
 13967  13968  13969  506  13972 0

c  -1-1 --> -2
c    ( b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧  b^{22, 23}_0 ∧ -p_506) -> ( b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0)
c  in CNF:
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨  b^{22, 24}_2
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨  b^{22, 24}_1
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨  p_506 ∨ -b^{22, 24}_0
c  in DIMACS:
-13967  13968 -13969  506  13970 0
-13967  13968 -13969  506  13971 0
-13967  13968 -13969  506 -13972 0

c  -2-1 --> break 
c    ( b^{22, 23}_2 ∧  b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨  b^{22, 23}_0 ∨  p_506 ∨ break
c  in DIMACS:
-13967 -13968  13969  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 23}_2 ∧ -b^{22, 23}_1 ∧ -b^{22, 23}_0 ∧ true) 
c  in CNF:
c    -b^{22, 23}_2 ∨  b^{22, 23}_1 ∨  b^{22, 23}_0 ∨ false 
c  in DIMACS:
-13967  13968  13969  0

c  3 does not represent an automaton state.
c    -(-b^{22, 23}_2 ∧  b^{22, 23}_1 ∧  b^{22, 23}_0 ∧ true) 
c  in CNF:
c     b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ false 
c  in DIMACS:
 13967 -13968 -13969  0
c  -3 does not represent an automaton state.
c    -( b^{22, 23}_2 ∧  b^{22, 23}_1 ∧  b^{22, 23}_0 ∧ true) 
c  in CNF:
c    -b^{22, 23}_2 ∨ -b^{22, 23}_1 ∨ -b^{22, 23}_0 ∨ false 
c  in DIMACS:
-13967 -13968 -13969  0

c i = 24
c  -2+1 --> -1
c    ( b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧  p_528) -> ( b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0)
c  in CNF:
c    -b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨  b^{22, 25}_2
c    -b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_1
c    -b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨  b^{22, 25}_0
c  in DIMACS:
-13970 -13971  13972 -528  13973 0
-13970 -13971  13972 -528 -13974 0
-13970 -13971  13972 -528  13975 0

c  -1+1 --> 0
c    ( b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0 ∧  p_528) -> (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧ -b^{22, 25}_0)
c  in CNF:
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_2
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_1
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_0
c  in DIMACS:
-13970  13971 -13972 -528 -13973 0
-13970  13971 -13972 -528 -13974 0
-13970  13971 -13972 -528 -13975 0

c  0+1 --> 1
c    (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧  p_528) -> (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0)
c  in CNF:
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_2
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_1
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨  b^{22, 25}_0
c  in DIMACS:
 13970  13971  13972 -528 -13973 0
 13970  13971  13972 -528 -13974 0
 13970  13971  13972 -528  13975 0

c  1+1 --> 2
c    (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0 ∧  p_528) -> (-b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0)
c  in CNF:
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_2
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨  b^{22, 25}_1
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ -p_528 ∨ -b^{22, 25}_0
c  in DIMACS:
 13970  13971 -13972 -528 -13973 0
 13970  13971 -13972 -528  13974 0
 13970  13971 -13972 -528 -13975 0

c  2+1 --> break 
c    (-b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧  p_528) -> break
c  in CNF:
c     b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 13970 -13971  13972 -528 1162 0


c  2-1 --> 1
c    (-b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧ -p_528) -> (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0)
c  in CNF:
c     b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_2
c     b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_1
c     b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨  b^{22, 25}_0
c  in DIMACS:
 13970 -13971  13972  528 -13973 0
 13970 -13971  13972  528 -13974 0
 13970 -13971  13972  528  13975 0

c  1-1 --> 0
c    (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0 ∧ -p_528) -> (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧ -b^{22, 25}_0)
c  in CNF:
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_2
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_1
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_0
c  in DIMACS:
 13970  13971 -13972  528 -13973 0
 13970  13971 -13972  528 -13974 0
 13970  13971 -13972  528 -13975 0

c  0-1 --> -1
c    (-b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧ -p_528) -> ( b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0)
c  in CNF:
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨  b^{22, 25}_2
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_1
c     b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨  b^{22, 25}_0
c  in DIMACS:
 13970  13971  13972  528  13973 0
 13970  13971  13972  528 -13974 0
 13970  13971  13972  528  13975 0

c  -1-1 --> -2
c    ( b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧  b^{22, 24}_0 ∧ -p_528) -> ( b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0)
c  in CNF:
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨  b^{22, 25}_2
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨  b^{22, 25}_1
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨  p_528 ∨ -b^{22, 25}_0
c  in DIMACS:
-13970  13971 -13972  528  13973 0
-13970  13971 -13972  528  13974 0
-13970  13971 -13972  528 -13975 0

c  -2-1 --> break 
c    ( b^{22, 24}_2 ∧  b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨  b^{22, 24}_0 ∨  p_528 ∨ break
c  in DIMACS:
-13970 -13971  13972  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 24}_2 ∧ -b^{22, 24}_1 ∧ -b^{22, 24}_0 ∧ true) 
c  in CNF:
c    -b^{22, 24}_2 ∨  b^{22, 24}_1 ∨  b^{22, 24}_0 ∨ false 
c  in DIMACS:
-13970  13971  13972  0

c  3 does not represent an automaton state.
c    -(-b^{22, 24}_2 ∧  b^{22, 24}_1 ∧  b^{22, 24}_0 ∧ true) 
c  in CNF:
c     b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ false 
c  in DIMACS:
 13970 -13971 -13972  0
c  -3 does not represent an automaton state.
c    -( b^{22, 24}_2 ∧  b^{22, 24}_1 ∧  b^{22, 24}_0 ∧ true) 
c  in CNF:
c    -b^{22, 24}_2 ∨ -b^{22, 24}_1 ∨ -b^{22, 24}_0 ∨ false 
c  in DIMACS:
-13970 -13971 -13972  0

c i = 25
c  -2+1 --> -1
c    ( b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧  p_550) -> ( b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0)
c  in CNF:
c    -b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨  b^{22, 26}_2
c    -b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_1
c    -b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨  b^{22, 26}_0
c  in DIMACS:
-13973 -13974  13975 -550  13976 0
-13973 -13974  13975 -550 -13977 0
-13973 -13974  13975 -550  13978 0

c  -1+1 --> 0
c    ( b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0 ∧  p_550) -> (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧ -b^{22, 26}_0)
c  in CNF:
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_2
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_1
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_0
c  in DIMACS:
-13973  13974 -13975 -550 -13976 0
-13973  13974 -13975 -550 -13977 0
-13973  13974 -13975 -550 -13978 0

c  0+1 --> 1
c    (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧  p_550) -> (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0)
c  in CNF:
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_2
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_1
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨  b^{22, 26}_0
c  in DIMACS:
 13973  13974  13975 -550 -13976 0
 13973  13974  13975 -550 -13977 0
 13973  13974  13975 -550  13978 0

c  1+1 --> 2
c    (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0 ∧  p_550) -> (-b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0)
c  in CNF:
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_2
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨  b^{22, 26}_1
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ -p_550 ∨ -b^{22, 26}_0
c  in DIMACS:
 13973  13974 -13975 -550 -13976 0
 13973  13974 -13975 -550  13977 0
 13973  13974 -13975 -550 -13978 0

c  2+1 --> break 
c    (-b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧  p_550) -> break
c  in CNF:
c     b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 13973 -13974  13975 -550 1162 0


c  2-1 --> 1
c    (-b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧ -p_550) -> (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0)
c  in CNF:
c     b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_2
c     b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_1
c     b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨  b^{22, 26}_0
c  in DIMACS:
 13973 -13974  13975  550 -13976 0
 13973 -13974  13975  550 -13977 0
 13973 -13974  13975  550  13978 0

c  1-1 --> 0
c    (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0 ∧ -p_550) -> (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧ -b^{22, 26}_0)
c  in CNF:
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_2
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_1
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_0
c  in DIMACS:
 13973  13974 -13975  550 -13976 0
 13973  13974 -13975  550 -13977 0
 13973  13974 -13975  550 -13978 0

c  0-1 --> -1
c    (-b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧ -p_550) -> ( b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0)
c  in CNF:
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨  b^{22, 26}_2
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_1
c     b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨  b^{22, 26}_0
c  in DIMACS:
 13973  13974  13975  550  13976 0
 13973  13974  13975  550 -13977 0
 13973  13974  13975  550  13978 0

c  -1-1 --> -2
c    ( b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧  b^{22, 25}_0 ∧ -p_550) -> ( b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0)
c  in CNF:
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨  b^{22, 26}_2
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨  b^{22, 26}_1
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨  p_550 ∨ -b^{22, 26}_0
c  in DIMACS:
-13973  13974 -13975  550  13976 0
-13973  13974 -13975  550  13977 0
-13973  13974 -13975  550 -13978 0

c  -2-1 --> break 
c    ( b^{22, 25}_2 ∧  b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨  b^{22, 25}_0 ∨  p_550 ∨ break
c  in DIMACS:
-13973 -13974  13975  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 25}_2 ∧ -b^{22, 25}_1 ∧ -b^{22, 25}_0 ∧ true) 
c  in CNF:
c    -b^{22, 25}_2 ∨  b^{22, 25}_1 ∨  b^{22, 25}_0 ∨ false 
c  in DIMACS:
-13973  13974  13975  0

c  3 does not represent an automaton state.
c    -(-b^{22, 25}_2 ∧  b^{22, 25}_1 ∧  b^{22, 25}_0 ∧ true) 
c  in CNF:
c     b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ false 
c  in DIMACS:
 13973 -13974 -13975  0
c  -3 does not represent an automaton state.
c    -( b^{22, 25}_2 ∧  b^{22, 25}_1 ∧  b^{22, 25}_0 ∧ true) 
c  in CNF:
c    -b^{22, 25}_2 ∨ -b^{22, 25}_1 ∨ -b^{22, 25}_0 ∨ false 
c  in DIMACS:
-13973 -13974 -13975  0

c i = 26
c  -2+1 --> -1
c    ( b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧  p_572) -> ( b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0)
c  in CNF:
c    -b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨  b^{22, 27}_2
c    -b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_1
c    -b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨  b^{22, 27}_0
c  in DIMACS:
-13976 -13977  13978 -572  13979 0
-13976 -13977  13978 -572 -13980 0
-13976 -13977  13978 -572  13981 0

c  -1+1 --> 0
c    ( b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0 ∧  p_572) -> (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧ -b^{22, 27}_0)
c  in CNF:
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_2
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_1
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_0
c  in DIMACS:
-13976  13977 -13978 -572 -13979 0
-13976  13977 -13978 -572 -13980 0
-13976  13977 -13978 -572 -13981 0

c  0+1 --> 1
c    (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧  p_572) -> (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0)
c  in CNF:
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_2
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_1
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨  b^{22, 27}_0
c  in DIMACS:
 13976  13977  13978 -572 -13979 0
 13976  13977  13978 -572 -13980 0
 13976  13977  13978 -572  13981 0

c  1+1 --> 2
c    (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0 ∧  p_572) -> (-b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0)
c  in CNF:
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_2
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨  b^{22, 27}_1
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ -p_572 ∨ -b^{22, 27}_0
c  in DIMACS:
 13976  13977 -13978 -572 -13979 0
 13976  13977 -13978 -572  13980 0
 13976  13977 -13978 -572 -13981 0

c  2+1 --> break 
c    (-b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧  p_572) -> break
c  in CNF:
c     b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 13976 -13977  13978 -572 1162 0


c  2-1 --> 1
c    (-b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧ -p_572) -> (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0)
c  in CNF:
c     b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_2
c     b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_1
c     b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨  b^{22, 27}_0
c  in DIMACS:
 13976 -13977  13978  572 -13979 0
 13976 -13977  13978  572 -13980 0
 13976 -13977  13978  572  13981 0

c  1-1 --> 0
c    (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0 ∧ -p_572) -> (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧ -b^{22, 27}_0)
c  in CNF:
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_2
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_1
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_0
c  in DIMACS:
 13976  13977 -13978  572 -13979 0
 13976  13977 -13978  572 -13980 0
 13976  13977 -13978  572 -13981 0

c  0-1 --> -1
c    (-b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧ -p_572) -> ( b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0)
c  in CNF:
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨  b^{22, 27}_2
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_1
c     b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨  b^{22, 27}_0
c  in DIMACS:
 13976  13977  13978  572  13979 0
 13976  13977  13978  572 -13980 0
 13976  13977  13978  572  13981 0

c  -1-1 --> -2
c    ( b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧  b^{22, 26}_0 ∧ -p_572) -> ( b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0)
c  in CNF:
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨  b^{22, 27}_2
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨  b^{22, 27}_1
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨  p_572 ∨ -b^{22, 27}_0
c  in DIMACS:
-13976  13977 -13978  572  13979 0
-13976  13977 -13978  572  13980 0
-13976  13977 -13978  572 -13981 0

c  -2-1 --> break 
c    ( b^{22, 26}_2 ∧  b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨  b^{22, 26}_0 ∨  p_572 ∨ break
c  in DIMACS:
-13976 -13977  13978  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 26}_2 ∧ -b^{22, 26}_1 ∧ -b^{22, 26}_0 ∧ true) 
c  in CNF:
c    -b^{22, 26}_2 ∨  b^{22, 26}_1 ∨  b^{22, 26}_0 ∨ false 
c  in DIMACS:
-13976  13977  13978  0

c  3 does not represent an automaton state.
c    -(-b^{22, 26}_2 ∧  b^{22, 26}_1 ∧  b^{22, 26}_0 ∧ true) 
c  in CNF:
c     b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ false 
c  in DIMACS:
 13976 -13977 -13978  0
c  -3 does not represent an automaton state.
c    -( b^{22, 26}_2 ∧  b^{22, 26}_1 ∧  b^{22, 26}_0 ∧ true) 
c  in CNF:
c    -b^{22, 26}_2 ∨ -b^{22, 26}_1 ∨ -b^{22, 26}_0 ∨ false 
c  in DIMACS:
-13976 -13977 -13978  0

c i = 27
c  -2+1 --> -1
c    ( b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧  p_594) -> ( b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0)
c  in CNF:
c    -b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨  b^{22, 28}_2
c    -b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_1
c    -b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨  b^{22, 28}_0
c  in DIMACS:
-13979 -13980  13981 -594  13982 0
-13979 -13980  13981 -594 -13983 0
-13979 -13980  13981 -594  13984 0

c  -1+1 --> 0
c    ( b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0 ∧  p_594) -> (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧ -b^{22, 28}_0)
c  in CNF:
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_2
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_1
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_0
c  in DIMACS:
-13979  13980 -13981 -594 -13982 0
-13979  13980 -13981 -594 -13983 0
-13979  13980 -13981 -594 -13984 0

c  0+1 --> 1
c    (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧  p_594) -> (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0)
c  in CNF:
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_2
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_1
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨  b^{22, 28}_0
c  in DIMACS:
 13979  13980  13981 -594 -13982 0
 13979  13980  13981 -594 -13983 0
 13979  13980  13981 -594  13984 0

c  1+1 --> 2
c    (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0 ∧  p_594) -> (-b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0)
c  in CNF:
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_2
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨  b^{22, 28}_1
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ -p_594 ∨ -b^{22, 28}_0
c  in DIMACS:
 13979  13980 -13981 -594 -13982 0
 13979  13980 -13981 -594  13983 0
 13979  13980 -13981 -594 -13984 0

c  2+1 --> break 
c    (-b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧  p_594) -> break
c  in CNF:
c     b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 13979 -13980  13981 -594 1162 0


c  2-1 --> 1
c    (-b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧ -p_594) -> (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0)
c  in CNF:
c     b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_2
c     b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_1
c     b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨  b^{22, 28}_0
c  in DIMACS:
 13979 -13980  13981  594 -13982 0
 13979 -13980  13981  594 -13983 0
 13979 -13980  13981  594  13984 0

c  1-1 --> 0
c    (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0 ∧ -p_594) -> (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧ -b^{22, 28}_0)
c  in CNF:
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_2
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_1
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_0
c  in DIMACS:
 13979  13980 -13981  594 -13982 0
 13979  13980 -13981  594 -13983 0
 13979  13980 -13981  594 -13984 0

c  0-1 --> -1
c    (-b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧ -p_594) -> ( b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0)
c  in CNF:
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨  b^{22, 28}_2
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_1
c     b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨  b^{22, 28}_0
c  in DIMACS:
 13979  13980  13981  594  13982 0
 13979  13980  13981  594 -13983 0
 13979  13980  13981  594  13984 0

c  -1-1 --> -2
c    ( b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧  b^{22, 27}_0 ∧ -p_594) -> ( b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0)
c  in CNF:
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨  b^{22, 28}_2
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨  b^{22, 28}_1
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨  p_594 ∨ -b^{22, 28}_0
c  in DIMACS:
-13979  13980 -13981  594  13982 0
-13979  13980 -13981  594  13983 0
-13979  13980 -13981  594 -13984 0

c  -2-1 --> break 
c    ( b^{22, 27}_2 ∧  b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨  b^{22, 27}_0 ∨  p_594 ∨ break
c  in DIMACS:
-13979 -13980  13981  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 27}_2 ∧ -b^{22, 27}_1 ∧ -b^{22, 27}_0 ∧ true) 
c  in CNF:
c    -b^{22, 27}_2 ∨  b^{22, 27}_1 ∨  b^{22, 27}_0 ∨ false 
c  in DIMACS:
-13979  13980  13981  0

c  3 does not represent an automaton state.
c    -(-b^{22, 27}_2 ∧  b^{22, 27}_1 ∧  b^{22, 27}_0 ∧ true) 
c  in CNF:
c     b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ false 
c  in DIMACS:
 13979 -13980 -13981  0
c  -3 does not represent an automaton state.
c    -( b^{22, 27}_2 ∧  b^{22, 27}_1 ∧  b^{22, 27}_0 ∧ true) 
c  in CNF:
c    -b^{22, 27}_2 ∨ -b^{22, 27}_1 ∨ -b^{22, 27}_0 ∨ false 
c  in DIMACS:
-13979 -13980 -13981  0

c i = 28
c  -2+1 --> -1
c    ( b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧  p_616) -> ( b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0)
c  in CNF:
c    -b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨  b^{22, 29}_2
c    -b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_1
c    -b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨  b^{22, 29}_0
c  in DIMACS:
-13982 -13983  13984 -616  13985 0
-13982 -13983  13984 -616 -13986 0
-13982 -13983  13984 -616  13987 0

c  -1+1 --> 0
c    ( b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0 ∧  p_616) -> (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧ -b^{22, 29}_0)
c  in CNF:
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_2
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_1
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_0
c  in DIMACS:
-13982  13983 -13984 -616 -13985 0
-13982  13983 -13984 -616 -13986 0
-13982  13983 -13984 -616 -13987 0

c  0+1 --> 1
c    (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧  p_616) -> (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0)
c  in CNF:
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_2
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_1
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨  b^{22, 29}_0
c  in DIMACS:
 13982  13983  13984 -616 -13985 0
 13982  13983  13984 -616 -13986 0
 13982  13983  13984 -616  13987 0

c  1+1 --> 2
c    (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0 ∧  p_616) -> (-b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0)
c  in CNF:
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_2
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨  b^{22, 29}_1
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ -p_616 ∨ -b^{22, 29}_0
c  in DIMACS:
 13982  13983 -13984 -616 -13985 0
 13982  13983 -13984 -616  13986 0
 13982  13983 -13984 -616 -13987 0

c  2+1 --> break 
c    (-b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧  p_616) -> break
c  in CNF:
c     b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 13982 -13983  13984 -616 1162 0


c  2-1 --> 1
c    (-b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧ -p_616) -> (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0)
c  in CNF:
c     b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_2
c     b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_1
c     b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨  b^{22, 29}_0
c  in DIMACS:
 13982 -13983  13984  616 -13985 0
 13982 -13983  13984  616 -13986 0
 13982 -13983  13984  616  13987 0

c  1-1 --> 0
c    (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0 ∧ -p_616) -> (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧ -b^{22, 29}_0)
c  in CNF:
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_2
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_1
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_0
c  in DIMACS:
 13982  13983 -13984  616 -13985 0
 13982  13983 -13984  616 -13986 0
 13982  13983 -13984  616 -13987 0

c  0-1 --> -1
c    (-b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧ -p_616) -> ( b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0)
c  in CNF:
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨  b^{22, 29}_2
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_1
c     b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨  b^{22, 29}_0
c  in DIMACS:
 13982  13983  13984  616  13985 0
 13982  13983  13984  616 -13986 0
 13982  13983  13984  616  13987 0

c  -1-1 --> -2
c    ( b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧  b^{22, 28}_0 ∧ -p_616) -> ( b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0)
c  in CNF:
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨  b^{22, 29}_2
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨  b^{22, 29}_1
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨  p_616 ∨ -b^{22, 29}_0
c  in DIMACS:
-13982  13983 -13984  616  13985 0
-13982  13983 -13984  616  13986 0
-13982  13983 -13984  616 -13987 0

c  -2-1 --> break 
c    ( b^{22, 28}_2 ∧  b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨  b^{22, 28}_0 ∨  p_616 ∨ break
c  in DIMACS:
-13982 -13983  13984  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 28}_2 ∧ -b^{22, 28}_1 ∧ -b^{22, 28}_0 ∧ true) 
c  in CNF:
c    -b^{22, 28}_2 ∨  b^{22, 28}_1 ∨  b^{22, 28}_0 ∨ false 
c  in DIMACS:
-13982  13983  13984  0

c  3 does not represent an automaton state.
c    -(-b^{22, 28}_2 ∧  b^{22, 28}_1 ∧  b^{22, 28}_0 ∧ true) 
c  in CNF:
c     b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ false 
c  in DIMACS:
 13982 -13983 -13984  0
c  -3 does not represent an automaton state.
c    -( b^{22, 28}_2 ∧  b^{22, 28}_1 ∧  b^{22, 28}_0 ∧ true) 
c  in CNF:
c    -b^{22, 28}_2 ∨ -b^{22, 28}_1 ∨ -b^{22, 28}_0 ∨ false 
c  in DIMACS:
-13982 -13983 -13984  0

c i = 29
c  -2+1 --> -1
c    ( b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧  p_638) -> ( b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0)
c  in CNF:
c    -b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨  b^{22, 30}_2
c    -b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_1
c    -b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨  b^{22, 30}_0
c  in DIMACS:
-13985 -13986  13987 -638  13988 0
-13985 -13986  13987 -638 -13989 0
-13985 -13986  13987 -638  13990 0

c  -1+1 --> 0
c    ( b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0 ∧  p_638) -> (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧ -b^{22, 30}_0)
c  in CNF:
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_2
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_1
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_0
c  in DIMACS:
-13985  13986 -13987 -638 -13988 0
-13985  13986 -13987 -638 -13989 0
-13985  13986 -13987 -638 -13990 0

c  0+1 --> 1
c    (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧  p_638) -> (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0)
c  in CNF:
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_2
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_1
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨  b^{22, 30}_0
c  in DIMACS:
 13985  13986  13987 -638 -13988 0
 13985  13986  13987 -638 -13989 0
 13985  13986  13987 -638  13990 0

c  1+1 --> 2
c    (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0 ∧  p_638) -> (-b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0)
c  in CNF:
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_2
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨  b^{22, 30}_1
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ -p_638 ∨ -b^{22, 30}_0
c  in DIMACS:
 13985  13986 -13987 -638 -13988 0
 13985  13986 -13987 -638  13989 0
 13985  13986 -13987 -638 -13990 0

c  2+1 --> break 
c    (-b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧  p_638) -> break
c  in CNF:
c     b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 13985 -13986  13987 -638 1162 0


c  2-1 --> 1
c    (-b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧ -p_638) -> (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0)
c  in CNF:
c     b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_2
c     b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_1
c     b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨  b^{22, 30}_0
c  in DIMACS:
 13985 -13986  13987  638 -13988 0
 13985 -13986  13987  638 -13989 0
 13985 -13986  13987  638  13990 0

c  1-1 --> 0
c    (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0 ∧ -p_638) -> (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧ -b^{22, 30}_0)
c  in CNF:
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_2
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_1
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_0
c  in DIMACS:
 13985  13986 -13987  638 -13988 0
 13985  13986 -13987  638 -13989 0
 13985  13986 -13987  638 -13990 0

c  0-1 --> -1
c    (-b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧ -p_638) -> ( b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0)
c  in CNF:
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨  b^{22, 30}_2
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_1
c     b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨  b^{22, 30}_0
c  in DIMACS:
 13985  13986  13987  638  13988 0
 13985  13986  13987  638 -13989 0
 13985  13986  13987  638  13990 0

c  -1-1 --> -2
c    ( b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧  b^{22, 29}_0 ∧ -p_638) -> ( b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0)
c  in CNF:
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨  b^{22, 30}_2
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨  b^{22, 30}_1
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨  p_638 ∨ -b^{22, 30}_0
c  in DIMACS:
-13985  13986 -13987  638  13988 0
-13985  13986 -13987  638  13989 0
-13985  13986 -13987  638 -13990 0

c  -2-1 --> break 
c    ( b^{22, 29}_2 ∧  b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨  b^{22, 29}_0 ∨  p_638 ∨ break
c  in DIMACS:
-13985 -13986  13987  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 29}_2 ∧ -b^{22, 29}_1 ∧ -b^{22, 29}_0 ∧ true) 
c  in CNF:
c    -b^{22, 29}_2 ∨  b^{22, 29}_1 ∨  b^{22, 29}_0 ∨ false 
c  in DIMACS:
-13985  13986  13987  0

c  3 does not represent an automaton state.
c    -(-b^{22, 29}_2 ∧  b^{22, 29}_1 ∧  b^{22, 29}_0 ∧ true) 
c  in CNF:
c     b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ false 
c  in DIMACS:
 13985 -13986 -13987  0
c  -3 does not represent an automaton state.
c    -( b^{22, 29}_2 ∧  b^{22, 29}_1 ∧  b^{22, 29}_0 ∧ true) 
c  in CNF:
c    -b^{22, 29}_2 ∨ -b^{22, 29}_1 ∨ -b^{22, 29}_0 ∨ false 
c  in DIMACS:
-13985 -13986 -13987  0

c i = 30
c  -2+1 --> -1
c    ( b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧  p_660) -> ( b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0)
c  in CNF:
c    -b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨  b^{22, 31}_2
c    -b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_1
c    -b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨  b^{22, 31}_0
c  in DIMACS:
-13988 -13989  13990 -660  13991 0
-13988 -13989  13990 -660 -13992 0
-13988 -13989  13990 -660  13993 0

c  -1+1 --> 0
c    ( b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0 ∧  p_660) -> (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧ -b^{22, 31}_0)
c  in CNF:
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_2
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_1
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_0
c  in DIMACS:
-13988  13989 -13990 -660 -13991 0
-13988  13989 -13990 -660 -13992 0
-13988  13989 -13990 -660 -13993 0

c  0+1 --> 1
c    (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧  p_660) -> (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0)
c  in CNF:
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_2
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_1
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨  b^{22, 31}_0
c  in DIMACS:
 13988  13989  13990 -660 -13991 0
 13988  13989  13990 -660 -13992 0
 13988  13989  13990 -660  13993 0

c  1+1 --> 2
c    (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0 ∧  p_660) -> (-b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0)
c  in CNF:
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_2
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨  b^{22, 31}_1
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ -p_660 ∨ -b^{22, 31}_0
c  in DIMACS:
 13988  13989 -13990 -660 -13991 0
 13988  13989 -13990 -660  13992 0
 13988  13989 -13990 -660 -13993 0

c  2+1 --> break 
c    (-b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧  p_660) -> break
c  in CNF:
c     b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 13988 -13989  13990 -660 1162 0


c  2-1 --> 1
c    (-b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧ -p_660) -> (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0)
c  in CNF:
c     b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_2
c     b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_1
c     b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨  b^{22, 31}_0
c  in DIMACS:
 13988 -13989  13990  660 -13991 0
 13988 -13989  13990  660 -13992 0
 13988 -13989  13990  660  13993 0

c  1-1 --> 0
c    (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0 ∧ -p_660) -> (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧ -b^{22, 31}_0)
c  in CNF:
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_2
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_1
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_0
c  in DIMACS:
 13988  13989 -13990  660 -13991 0
 13988  13989 -13990  660 -13992 0
 13988  13989 -13990  660 -13993 0

c  0-1 --> -1
c    (-b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧ -p_660) -> ( b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0)
c  in CNF:
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨  b^{22, 31}_2
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_1
c     b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨  b^{22, 31}_0
c  in DIMACS:
 13988  13989  13990  660  13991 0
 13988  13989  13990  660 -13992 0
 13988  13989  13990  660  13993 0

c  -1-1 --> -2
c    ( b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧  b^{22, 30}_0 ∧ -p_660) -> ( b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0)
c  in CNF:
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨  b^{22, 31}_2
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨  b^{22, 31}_1
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨  p_660 ∨ -b^{22, 31}_0
c  in DIMACS:
-13988  13989 -13990  660  13991 0
-13988  13989 -13990  660  13992 0
-13988  13989 -13990  660 -13993 0

c  -2-1 --> break 
c    ( b^{22, 30}_2 ∧  b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨  b^{22, 30}_0 ∨  p_660 ∨ break
c  in DIMACS:
-13988 -13989  13990  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 30}_2 ∧ -b^{22, 30}_1 ∧ -b^{22, 30}_0 ∧ true) 
c  in CNF:
c    -b^{22, 30}_2 ∨  b^{22, 30}_1 ∨  b^{22, 30}_0 ∨ false 
c  in DIMACS:
-13988  13989  13990  0

c  3 does not represent an automaton state.
c    -(-b^{22, 30}_2 ∧  b^{22, 30}_1 ∧  b^{22, 30}_0 ∧ true) 
c  in CNF:
c     b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ false 
c  in DIMACS:
 13988 -13989 -13990  0
c  -3 does not represent an automaton state.
c    -( b^{22, 30}_2 ∧  b^{22, 30}_1 ∧  b^{22, 30}_0 ∧ true) 
c  in CNF:
c    -b^{22, 30}_2 ∨ -b^{22, 30}_1 ∨ -b^{22, 30}_0 ∨ false 
c  in DIMACS:
-13988 -13989 -13990  0

c i = 31
c  -2+1 --> -1
c    ( b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧  p_682) -> ( b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0)
c  in CNF:
c    -b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨  b^{22, 32}_2
c    -b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_1
c    -b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨  b^{22, 32}_0
c  in DIMACS:
-13991 -13992  13993 -682  13994 0
-13991 -13992  13993 -682 -13995 0
-13991 -13992  13993 -682  13996 0

c  -1+1 --> 0
c    ( b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0 ∧  p_682) -> (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧ -b^{22, 32}_0)
c  in CNF:
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_2
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_1
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_0
c  in DIMACS:
-13991  13992 -13993 -682 -13994 0
-13991  13992 -13993 -682 -13995 0
-13991  13992 -13993 -682 -13996 0

c  0+1 --> 1
c    (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧  p_682) -> (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0)
c  in CNF:
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_2
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_1
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨  b^{22, 32}_0
c  in DIMACS:
 13991  13992  13993 -682 -13994 0
 13991  13992  13993 -682 -13995 0
 13991  13992  13993 -682  13996 0

c  1+1 --> 2
c    (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0 ∧  p_682) -> (-b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0)
c  in CNF:
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_2
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨  b^{22, 32}_1
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ -p_682 ∨ -b^{22, 32}_0
c  in DIMACS:
 13991  13992 -13993 -682 -13994 0
 13991  13992 -13993 -682  13995 0
 13991  13992 -13993 -682 -13996 0

c  2+1 --> break 
c    (-b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧  p_682) -> break
c  in CNF:
c     b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 13991 -13992  13993 -682 1162 0


c  2-1 --> 1
c    (-b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧ -p_682) -> (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0)
c  in CNF:
c     b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_2
c     b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_1
c     b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨  b^{22, 32}_0
c  in DIMACS:
 13991 -13992  13993  682 -13994 0
 13991 -13992  13993  682 -13995 0
 13991 -13992  13993  682  13996 0

c  1-1 --> 0
c    (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0 ∧ -p_682) -> (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧ -b^{22, 32}_0)
c  in CNF:
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_2
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_1
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_0
c  in DIMACS:
 13991  13992 -13993  682 -13994 0
 13991  13992 -13993  682 -13995 0
 13991  13992 -13993  682 -13996 0

c  0-1 --> -1
c    (-b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧ -p_682) -> ( b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0)
c  in CNF:
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨  b^{22, 32}_2
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_1
c     b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨  b^{22, 32}_0
c  in DIMACS:
 13991  13992  13993  682  13994 0
 13991  13992  13993  682 -13995 0
 13991  13992  13993  682  13996 0

c  -1-1 --> -2
c    ( b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧  b^{22, 31}_0 ∧ -p_682) -> ( b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0)
c  in CNF:
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨  b^{22, 32}_2
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨  b^{22, 32}_1
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨  p_682 ∨ -b^{22, 32}_0
c  in DIMACS:
-13991  13992 -13993  682  13994 0
-13991  13992 -13993  682  13995 0
-13991  13992 -13993  682 -13996 0

c  -2-1 --> break 
c    ( b^{22, 31}_2 ∧  b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨  b^{22, 31}_0 ∨  p_682 ∨ break
c  in DIMACS:
-13991 -13992  13993  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 31}_2 ∧ -b^{22, 31}_1 ∧ -b^{22, 31}_0 ∧ true) 
c  in CNF:
c    -b^{22, 31}_2 ∨  b^{22, 31}_1 ∨  b^{22, 31}_0 ∨ false 
c  in DIMACS:
-13991  13992  13993  0

c  3 does not represent an automaton state.
c    -(-b^{22, 31}_2 ∧  b^{22, 31}_1 ∧  b^{22, 31}_0 ∧ true) 
c  in CNF:
c     b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ false 
c  in DIMACS:
 13991 -13992 -13993  0
c  -3 does not represent an automaton state.
c    -( b^{22, 31}_2 ∧  b^{22, 31}_1 ∧  b^{22, 31}_0 ∧ true) 
c  in CNF:
c    -b^{22, 31}_2 ∨ -b^{22, 31}_1 ∨ -b^{22, 31}_0 ∨ false 
c  in DIMACS:
-13991 -13992 -13993  0

c i = 32
c  -2+1 --> -1
c    ( b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧  p_704) -> ( b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0)
c  in CNF:
c    -b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨  b^{22, 33}_2
c    -b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_1
c    -b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨  b^{22, 33}_0
c  in DIMACS:
-13994 -13995  13996 -704  13997 0
-13994 -13995  13996 -704 -13998 0
-13994 -13995  13996 -704  13999 0

c  -1+1 --> 0
c    ( b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0 ∧  p_704) -> (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧ -b^{22, 33}_0)
c  in CNF:
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_2
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_1
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_0
c  in DIMACS:
-13994  13995 -13996 -704 -13997 0
-13994  13995 -13996 -704 -13998 0
-13994  13995 -13996 -704 -13999 0

c  0+1 --> 1
c    (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧  p_704) -> (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0)
c  in CNF:
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_2
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_1
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨  b^{22, 33}_0
c  in DIMACS:
 13994  13995  13996 -704 -13997 0
 13994  13995  13996 -704 -13998 0
 13994  13995  13996 -704  13999 0

c  1+1 --> 2
c    (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0 ∧  p_704) -> (-b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0)
c  in CNF:
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_2
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨  b^{22, 33}_1
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ -p_704 ∨ -b^{22, 33}_0
c  in DIMACS:
 13994  13995 -13996 -704 -13997 0
 13994  13995 -13996 -704  13998 0
 13994  13995 -13996 -704 -13999 0

c  2+1 --> break 
c    (-b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧  p_704) -> break
c  in CNF:
c     b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 13994 -13995  13996 -704 1162 0


c  2-1 --> 1
c    (-b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧ -p_704) -> (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0)
c  in CNF:
c     b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_2
c     b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_1
c     b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨  b^{22, 33}_0
c  in DIMACS:
 13994 -13995  13996  704 -13997 0
 13994 -13995  13996  704 -13998 0
 13994 -13995  13996  704  13999 0

c  1-1 --> 0
c    (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0 ∧ -p_704) -> (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧ -b^{22, 33}_0)
c  in CNF:
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_2
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_1
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_0
c  in DIMACS:
 13994  13995 -13996  704 -13997 0
 13994  13995 -13996  704 -13998 0
 13994  13995 -13996  704 -13999 0

c  0-1 --> -1
c    (-b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧ -p_704) -> ( b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0)
c  in CNF:
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨  b^{22, 33}_2
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_1
c     b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨  b^{22, 33}_0
c  in DIMACS:
 13994  13995  13996  704  13997 0
 13994  13995  13996  704 -13998 0
 13994  13995  13996  704  13999 0

c  -1-1 --> -2
c    ( b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧  b^{22, 32}_0 ∧ -p_704) -> ( b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0)
c  in CNF:
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨  b^{22, 33}_2
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨  b^{22, 33}_1
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨  p_704 ∨ -b^{22, 33}_0
c  in DIMACS:
-13994  13995 -13996  704  13997 0
-13994  13995 -13996  704  13998 0
-13994  13995 -13996  704 -13999 0

c  -2-1 --> break 
c    ( b^{22, 32}_2 ∧  b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨  b^{22, 32}_0 ∨  p_704 ∨ break
c  in DIMACS:
-13994 -13995  13996  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 32}_2 ∧ -b^{22, 32}_1 ∧ -b^{22, 32}_0 ∧ true) 
c  in CNF:
c    -b^{22, 32}_2 ∨  b^{22, 32}_1 ∨  b^{22, 32}_0 ∨ false 
c  in DIMACS:
-13994  13995  13996  0

c  3 does not represent an automaton state.
c    -(-b^{22, 32}_2 ∧  b^{22, 32}_1 ∧  b^{22, 32}_0 ∧ true) 
c  in CNF:
c     b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ false 
c  in DIMACS:
 13994 -13995 -13996  0
c  -3 does not represent an automaton state.
c    -( b^{22, 32}_2 ∧  b^{22, 32}_1 ∧  b^{22, 32}_0 ∧ true) 
c  in CNF:
c    -b^{22, 32}_2 ∨ -b^{22, 32}_1 ∨ -b^{22, 32}_0 ∨ false 
c  in DIMACS:
-13994 -13995 -13996  0

c i = 33
c  -2+1 --> -1
c    ( b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧  p_726) -> ( b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0)
c  in CNF:
c    -b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨  b^{22, 34}_2
c    -b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_1
c    -b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨  b^{22, 34}_0
c  in DIMACS:
-13997 -13998  13999 -726  14000 0
-13997 -13998  13999 -726 -14001 0
-13997 -13998  13999 -726  14002 0

c  -1+1 --> 0
c    ( b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0 ∧  p_726) -> (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧ -b^{22, 34}_0)
c  in CNF:
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_2
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_1
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_0
c  in DIMACS:
-13997  13998 -13999 -726 -14000 0
-13997  13998 -13999 -726 -14001 0
-13997  13998 -13999 -726 -14002 0

c  0+1 --> 1
c    (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧  p_726) -> (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0)
c  in CNF:
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_2
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_1
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨  b^{22, 34}_0
c  in DIMACS:
 13997  13998  13999 -726 -14000 0
 13997  13998  13999 -726 -14001 0
 13997  13998  13999 -726  14002 0

c  1+1 --> 2
c    (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0 ∧  p_726) -> (-b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0)
c  in CNF:
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_2
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨  b^{22, 34}_1
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ -p_726 ∨ -b^{22, 34}_0
c  in DIMACS:
 13997  13998 -13999 -726 -14000 0
 13997  13998 -13999 -726  14001 0
 13997  13998 -13999 -726 -14002 0

c  2+1 --> break 
c    (-b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧  p_726) -> break
c  in CNF:
c     b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 13997 -13998  13999 -726 1162 0


c  2-1 --> 1
c    (-b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧ -p_726) -> (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0)
c  in CNF:
c     b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_2
c     b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_1
c     b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨  b^{22, 34}_0
c  in DIMACS:
 13997 -13998  13999  726 -14000 0
 13997 -13998  13999  726 -14001 0
 13997 -13998  13999  726  14002 0

c  1-1 --> 0
c    (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0 ∧ -p_726) -> (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧ -b^{22, 34}_0)
c  in CNF:
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_2
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_1
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_0
c  in DIMACS:
 13997  13998 -13999  726 -14000 0
 13997  13998 -13999  726 -14001 0
 13997  13998 -13999  726 -14002 0

c  0-1 --> -1
c    (-b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧ -p_726) -> ( b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0)
c  in CNF:
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨  b^{22, 34}_2
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_1
c     b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨  b^{22, 34}_0
c  in DIMACS:
 13997  13998  13999  726  14000 0
 13997  13998  13999  726 -14001 0
 13997  13998  13999  726  14002 0

c  -1-1 --> -2
c    ( b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧  b^{22, 33}_0 ∧ -p_726) -> ( b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0)
c  in CNF:
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨  b^{22, 34}_2
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨  b^{22, 34}_1
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨  p_726 ∨ -b^{22, 34}_0
c  in DIMACS:
-13997  13998 -13999  726  14000 0
-13997  13998 -13999  726  14001 0
-13997  13998 -13999  726 -14002 0

c  -2-1 --> break 
c    ( b^{22, 33}_2 ∧  b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨  b^{22, 33}_0 ∨  p_726 ∨ break
c  in DIMACS:
-13997 -13998  13999  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 33}_2 ∧ -b^{22, 33}_1 ∧ -b^{22, 33}_0 ∧ true) 
c  in CNF:
c    -b^{22, 33}_2 ∨  b^{22, 33}_1 ∨  b^{22, 33}_0 ∨ false 
c  in DIMACS:
-13997  13998  13999  0

c  3 does not represent an automaton state.
c    -(-b^{22, 33}_2 ∧  b^{22, 33}_1 ∧  b^{22, 33}_0 ∧ true) 
c  in CNF:
c     b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ false 
c  in DIMACS:
 13997 -13998 -13999  0
c  -3 does not represent an automaton state.
c    -( b^{22, 33}_2 ∧  b^{22, 33}_1 ∧  b^{22, 33}_0 ∧ true) 
c  in CNF:
c    -b^{22, 33}_2 ∨ -b^{22, 33}_1 ∨ -b^{22, 33}_0 ∨ false 
c  in DIMACS:
-13997 -13998 -13999  0

c i = 34
c  -2+1 --> -1
c    ( b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧  p_748) -> ( b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0)
c  in CNF:
c    -b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨  b^{22, 35}_2
c    -b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_1
c    -b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨  b^{22, 35}_0
c  in DIMACS:
-14000 -14001  14002 -748  14003 0
-14000 -14001  14002 -748 -14004 0
-14000 -14001  14002 -748  14005 0

c  -1+1 --> 0
c    ( b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0 ∧  p_748) -> (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧ -b^{22, 35}_0)
c  in CNF:
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_2
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_1
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_0
c  in DIMACS:
-14000  14001 -14002 -748 -14003 0
-14000  14001 -14002 -748 -14004 0
-14000  14001 -14002 -748 -14005 0

c  0+1 --> 1
c    (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧  p_748) -> (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0)
c  in CNF:
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_2
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_1
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨  b^{22, 35}_0
c  in DIMACS:
 14000  14001  14002 -748 -14003 0
 14000  14001  14002 -748 -14004 0
 14000  14001  14002 -748  14005 0

c  1+1 --> 2
c    (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0 ∧  p_748) -> (-b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0)
c  in CNF:
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_2
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨  b^{22, 35}_1
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ -p_748 ∨ -b^{22, 35}_0
c  in DIMACS:
 14000  14001 -14002 -748 -14003 0
 14000  14001 -14002 -748  14004 0
 14000  14001 -14002 -748 -14005 0

c  2+1 --> break 
c    (-b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧  p_748) -> break
c  in CNF:
c     b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 14000 -14001  14002 -748 1162 0


c  2-1 --> 1
c    (-b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧ -p_748) -> (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0)
c  in CNF:
c     b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_2
c     b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_1
c     b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨  b^{22, 35}_0
c  in DIMACS:
 14000 -14001  14002  748 -14003 0
 14000 -14001  14002  748 -14004 0
 14000 -14001  14002  748  14005 0

c  1-1 --> 0
c    (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0 ∧ -p_748) -> (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧ -b^{22, 35}_0)
c  in CNF:
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_2
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_1
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_0
c  in DIMACS:
 14000  14001 -14002  748 -14003 0
 14000  14001 -14002  748 -14004 0
 14000  14001 -14002  748 -14005 0

c  0-1 --> -1
c    (-b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧ -p_748) -> ( b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0)
c  in CNF:
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨  b^{22, 35}_2
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_1
c     b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨  b^{22, 35}_0
c  in DIMACS:
 14000  14001  14002  748  14003 0
 14000  14001  14002  748 -14004 0
 14000  14001  14002  748  14005 0

c  -1-1 --> -2
c    ( b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧  b^{22, 34}_0 ∧ -p_748) -> ( b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0)
c  in CNF:
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨  b^{22, 35}_2
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨  b^{22, 35}_1
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨  p_748 ∨ -b^{22, 35}_0
c  in DIMACS:
-14000  14001 -14002  748  14003 0
-14000  14001 -14002  748  14004 0
-14000  14001 -14002  748 -14005 0

c  -2-1 --> break 
c    ( b^{22, 34}_2 ∧  b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨  b^{22, 34}_0 ∨  p_748 ∨ break
c  in DIMACS:
-14000 -14001  14002  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 34}_2 ∧ -b^{22, 34}_1 ∧ -b^{22, 34}_0 ∧ true) 
c  in CNF:
c    -b^{22, 34}_2 ∨  b^{22, 34}_1 ∨  b^{22, 34}_0 ∨ false 
c  in DIMACS:
-14000  14001  14002  0

c  3 does not represent an automaton state.
c    -(-b^{22, 34}_2 ∧  b^{22, 34}_1 ∧  b^{22, 34}_0 ∧ true) 
c  in CNF:
c     b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ false 
c  in DIMACS:
 14000 -14001 -14002  0
c  -3 does not represent an automaton state.
c    -( b^{22, 34}_2 ∧  b^{22, 34}_1 ∧  b^{22, 34}_0 ∧ true) 
c  in CNF:
c    -b^{22, 34}_2 ∨ -b^{22, 34}_1 ∨ -b^{22, 34}_0 ∨ false 
c  in DIMACS:
-14000 -14001 -14002  0

c i = 35
c  -2+1 --> -1
c    ( b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧  p_770) -> ( b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0)
c  in CNF:
c    -b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨  b^{22, 36}_2
c    -b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_1
c    -b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨  b^{22, 36}_0
c  in DIMACS:
-14003 -14004  14005 -770  14006 0
-14003 -14004  14005 -770 -14007 0
-14003 -14004  14005 -770  14008 0

c  -1+1 --> 0
c    ( b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0 ∧  p_770) -> (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧ -b^{22, 36}_0)
c  in CNF:
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_2
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_1
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_0
c  in DIMACS:
-14003  14004 -14005 -770 -14006 0
-14003  14004 -14005 -770 -14007 0
-14003  14004 -14005 -770 -14008 0

c  0+1 --> 1
c    (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧  p_770) -> (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0)
c  in CNF:
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_2
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_1
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨  b^{22, 36}_0
c  in DIMACS:
 14003  14004  14005 -770 -14006 0
 14003  14004  14005 -770 -14007 0
 14003  14004  14005 -770  14008 0

c  1+1 --> 2
c    (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0 ∧  p_770) -> (-b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0)
c  in CNF:
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_2
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨  b^{22, 36}_1
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ -p_770 ∨ -b^{22, 36}_0
c  in DIMACS:
 14003  14004 -14005 -770 -14006 0
 14003  14004 -14005 -770  14007 0
 14003  14004 -14005 -770 -14008 0

c  2+1 --> break 
c    (-b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧  p_770) -> break
c  in CNF:
c     b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 14003 -14004  14005 -770 1162 0


c  2-1 --> 1
c    (-b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧ -p_770) -> (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0)
c  in CNF:
c     b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_2
c     b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_1
c     b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨  b^{22, 36}_0
c  in DIMACS:
 14003 -14004  14005  770 -14006 0
 14003 -14004  14005  770 -14007 0
 14003 -14004  14005  770  14008 0

c  1-1 --> 0
c    (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0 ∧ -p_770) -> (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧ -b^{22, 36}_0)
c  in CNF:
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_2
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_1
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_0
c  in DIMACS:
 14003  14004 -14005  770 -14006 0
 14003  14004 -14005  770 -14007 0
 14003  14004 -14005  770 -14008 0

c  0-1 --> -1
c    (-b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧ -p_770) -> ( b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0)
c  in CNF:
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨  b^{22, 36}_2
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_1
c     b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨  b^{22, 36}_0
c  in DIMACS:
 14003  14004  14005  770  14006 0
 14003  14004  14005  770 -14007 0
 14003  14004  14005  770  14008 0

c  -1-1 --> -2
c    ( b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧  b^{22, 35}_0 ∧ -p_770) -> ( b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0)
c  in CNF:
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨  b^{22, 36}_2
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨  b^{22, 36}_1
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨  p_770 ∨ -b^{22, 36}_0
c  in DIMACS:
-14003  14004 -14005  770  14006 0
-14003  14004 -14005  770  14007 0
-14003  14004 -14005  770 -14008 0

c  -2-1 --> break 
c    ( b^{22, 35}_2 ∧  b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨  b^{22, 35}_0 ∨  p_770 ∨ break
c  in DIMACS:
-14003 -14004  14005  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 35}_2 ∧ -b^{22, 35}_1 ∧ -b^{22, 35}_0 ∧ true) 
c  in CNF:
c    -b^{22, 35}_2 ∨  b^{22, 35}_1 ∨  b^{22, 35}_0 ∨ false 
c  in DIMACS:
-14003  14004  14005  0

c  3 does not represent an automaton state.
c    -(-b^{22, 35}_2 ∧  b^{22, 35}_1 ∧  b^{22, 35}_0 ∧ true) 
c  in CNF:
c     b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ false 
c  in DIMACS:
 14003 -14004 -14005  0
c  -3 does not represent an automaton state.
c    -( b^{22, 35}_2 ∧  b^{22, 35}_1 ∧  b^{22, 35}_0 ∧ true) 
c  in CNF:
c    -b^{22, 35}_2 ∨ -b^{22, 35}_1 ∨ -b^{22, 35}_0 ∨ false 
c  in DIMACS:
-14003 -14004 -14005  0

c i = 36
c  -2+1 --> -1
c    ( b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧  p_792) -> ( b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0)
c  in CNF:
c    -b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨  b^{22, 37}_2
c    -b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_1
c    -b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨  b^{22, 37}_0
c  in DIMACS:
-14006 -14007  14008 -792  14009 0
-14006 -14007  14008 -792 -14010 0
-14006 -14007  14008 -792  14011 0

c  -1+1 --> 0
c    ( b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0 ∧  p_792) -> (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧ -b^{22, 37}_0)
c  in CNF:
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_2
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_1
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_0
c  in DIMACS:
-14006  14007 -14008 -792 -14009 0
-14006  14007 -14008 -792 -14010 0
-14006  14007 -14008 -792 -14011 0

c  0+1 --> 1
c    (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧  p_792) -> (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0)
c  in CNF:
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_2
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_1
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨  b^{22, 37}_0
c  in DIMACS:
 14006  14007  14008 -792 -14009 0
 14006  14007  14008 -792 -14010 0
 14006  14007  14008 -792  14011 0

c  1+1 --> 2
c    (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0 ∧  p_792) -> (-b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0)
c  in CNF:
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_2
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨  b^{22, 37}_1
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ -p_792 ∨ -b^{22, 37}_0
c  in DIMACS:
 14006  14007 -14008 -792 -14009 0
 14006  14007 -14008 -792  14010 0
 14006  14007 -14008 -792 -14011 0

c  2+1 --> break 
c    (-b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧  p_792) -> break
c  in CNF:
c     b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 14006 -14007  14008 -792 1162 0


c  2-1 --> 1
c    (-b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧ -p_792) -> (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0)
c  in CNF:
c     b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_2
c     b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_1
c     b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨  b^{22, 37}_0
c  in DIMACS:
 14006 -14007  14008  792 -14009 0
 14006 -14007  14008  792 -14010 0
 14006 -14007  14008  792  14011 0

c  1-1 --> 0
c    (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0 ∧ -p_792) -> (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧ -b^{22, 37}_0)
c  in CNF:
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_2
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_1
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_0
c  in DIMACS:
 14006  14007 -14008  792 -14009 0
 14006  14007 -14008  792 -14010 0
 14006  14007 -14008  792 -14011 0

c  0-1 --> -1
c    (-b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧ -p_792) -> ( b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0)
c  in CNF:
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨  b^{22, 37}_2
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_1
c     b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨  b^{22, 37}_0
c  in DIMACS:
 14006  14007  14008  792  14009 0
 14006  14007  14008  792 -14010 0
 14006  14007  14008  792  14011 0

c  -1-1 --> -2
c    ( b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧  b^{22, 36}_0 ∧ -p_792) -> ( b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0)
c  in CNF:
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨  b^{22, 37}_2
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨  b^{22, 37}_1
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨  p_792 ∨ -b^{22, 37}_0
c  in DIMACS:
-14006  14007 -14008  792  14009 0
-14006  14007 -14008  792  14010 0
-14006  14007 -14008  792 -14011 0

c  -2-1 --> break 
c    ( b^{22, 36}_2 ∧  b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨  b^{22, 36}_0 ∨  p_792 ∨ break
c  in DIMACS:
-14006 -14007  14008  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 36}_2 ∧ -b^{22, 36}_1 ∧ -b^{22, 36}_0 ∧ true) 
c  in CNF:
c    -b^{22, 36}_2 ∨  b^{22, 36}_1 ∨  b^{22, 36}_0 ∨ false 
c  in DIMACS:
-14006  14007  14008  0

c  3 does not represent an automaton state.
c    -(-b^{22, 36}_2 ∧  b^{22, 36}_1 ∧  b^{22, 36}_0 ∧ true) 
c  in CNF:
c     b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ false 
c  in DIMACS:
 14006 -14007 -14008  0
c  -3 does not represent an automaton state.
c    -( b^{22, 36}_2 ∧  b^{22, 36}_1 ∧  b^{22, 36}_0 ∧ true) 
c  in CNF:
c    -b^{22, 36}_2 ∨ -b^{22, 36}_1 ∨ -b^{22, 36}_0 ∨ false 
c  in DIMACS:
-14006 -14007 -14008  0

c i = 37
c  -2+1 --> -1
c    ( b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧  p_814) -> ( b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0)
c  in CNF:
c    -b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨  b^{22, 38}_2
c    -b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_1
c    -b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨  b^{22, 38}_0
c  in DIMACS:
-14009 -14010  14011 -814  14012 0
-14009 -14010  14011 -814 -14013 0
-14009 -14010  14011 -814  14014 0

c  -1+1 --> 0
c    ( b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0 ∧  p_814) -> (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧ -b^{22, 38}_0)
c  in CNF:
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_2
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_1
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_0
c  in DIMACS:
-14009  14010 -14011 -814 -14012 0
-14009  14010 -14011 -814 -14013 0
-14009  14010 -14011 -814 -14014 0

c  0+1 --> 1
c    (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧  p_814) -> (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0)
c  in CNF:
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_2
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_1
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨  b^{22, 38}_0
c  in DIMACS:
 14009  14010  14011 -814 -14012 0
 14009  14010  14011 -814 -14013 0
 14009  14010  14011 -814  14014 0

c  1+1 --> 2
c    (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0 ∧  p_814) -> (-b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0)
c  in CNF:
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_2
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨  b^{22, 38}_1
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ -p_814 ∨ -b^{22, 38}_0
c  in DIMACS:
 14009  14010 -14011 -814 -14012 0
 14009  14010 -14011 -814  14013 0
 14009  14010 -14011 -814 -14014 0

c  2+1 --> break 
c    (-b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧  p_814) -> break
c  in CNF:
c     b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 14009 -14010  14011 -814 1162 0


c  2-1 --> 1
c    (-b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧ -p_814) -> (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0)
c  in CNF:
c     b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_2
c     b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_1
c     b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨  b^{22, 38}_0
c  in DIMACS:
 14009 -14010  14011  814 -14012 0
 14009 -14010  14011  814 -14013 0
 14009 -14010  14011  814  14014 0

c  1-1 --> 0
c    (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0 ∧ -p_814) -> (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧ -b^{22, 38}_0)
c  in CNF:
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_2
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_1
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_0
c  in DIMACS:
 14009  14010 -14011  814 -14012 0
 14009  14010 -14011  814 -14013 0
 14009  14010 -14011  814 -14014 0

c  0-1 --> -1
c    (-b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧ -p_814) -> ( b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0)
c  in CNF:
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨  b^{22, 38}_2
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_1
c     b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨  b^{22, 38}_0
c  in DIMACS:
 14009  14010  14011  814  14012 0
 14009  14010  14011  814 -14013 0
 14009  14010  14011  814  14014 0

c  -1-1 --> -2
c    ( b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧  b^{22, 37}_0 ∧ -p_814) -> ( b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0)
c  in CNF:
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨  b^{22, 38}_2
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨  b^{22, 38}_1
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨  p_814 ∨ -b^{22, 38}_0
c  in DIMACS:
-14009  14010 -14011  814  14012 0
-14009  14010 -14011  814  14013 0
-14009  14010 -14011  814 -14014 0

c  -2-1 --> break 
c    ( b^{22, 37}_2 ∧  b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨  b^{22, 37}_0 ∨  p_814 ∨ break
c  in DIMACS:
-14009 -14010  14011  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 37}_2 ∧ -b^{22, 37}_1 ∧ -b^{22, 37}_0 ∧ true) 
c  in CNF:
c    -b^{22, 37}_2 ∨  b^{22, 37}_1 ∨  b^{22, 37}_0 ∨ false 
c  in DIMACS:
-14009  14010  14011  0

c  3 does not represent an automaton state.
c    -(-b^{22, 37}_2 ∧  b^{22, 37}_1 ∧  b^{22, 37}_0 ∧ true) 
c  in CNF:
c     b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ false 
c  in DIMACS:
 14009 -14010 -14011  0
c  -3 does not represent an automaton state.
c    -( b^{22, 37}_2 ∧  b^{22, 37}_1 ∧  b^{22, 37}_0 ∧ true) 
c  in CNF:
c    -b^{22, 37}_2 ∨ -b^{22, 37}_1 ∨ -b^{22, 37}_0 ∨ false 
c  in DIMACS:
-14009 -14010 -14011  0

c i = 38
c  -2+1 --> -1
c    ( b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧  p_836) -> ( b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0)
c  in CNF:
c    -b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨  b^{22, 39}_2
c    -b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_1
c    -b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨  b^{22, 39}_0
c  in DIMACS:
-14012 -14013  14014 -836  14015 0
-14012 -14013  14014 -836 -14016 0
-14012 -14013  14014 -836  14017 0

c  -1+1 --> 0
c    ( b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0 ∧  p_836) -> (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧ -b^{22, 39}_0)
c  in CNF:
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_2
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_1
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_0
c  in DIMACS:
-14012  14013 -14014 -836 -14015 0
-14012  14013 -14014 -836 -14016 0
-14012  14013 -14014 -836 -14017 0

c  0+1 --> 1
c    (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧  p_836) -> (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0)
c  in CNF:
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_2
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_1
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨  b^{22, 39}_0
c  in DIMACS:
 14012  14013  14014 -836 -14015 0
 14012  14013  14014 -836 -14016 0
 14012  14013  14014 -836  14017 0

c  1+1 --> 2
c    (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0 ∧  p_836) -> (-b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0)
c  in CNF:
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_2
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨  b^{22, 39}_1
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ -p_836 ∨ -b^{22, 39}_0
c  in DIMACS:
 14012  14013 -14014 -836 -14015 0
 14012  14013 -14014 -836  14016 0
 14012  14013 -14014 -836 -14017 0

c  2+1 --> break 
c    (-b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧  p_836) -> break
c  in CNF:
c     b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 14012 -14013  14014 -836 1162 0


c  2-1 --> 1
c    (-b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧ -p_836) -> (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0)
c  in CNF:
c     b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_2
c     b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_1
c     b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨  b^{22, 39}_0
c  in DIMACS:
 14012 -14013  14014  836 -14015 0
 14012 -14013  14014  836 -14016 0
 14012 -14013  14014  836  14017 0

c  1-1 --> 0
c    (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0 ∧ -p_836) -> (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧ -b^{22, 39}_0)
c  in CNF:
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_2
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_1
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_0
c  in DIMACS:
 14012  14013 -14014  836 -14015 0
 14012  14013 -14014  836 -14016 0
 14012  14013 -14014  836 -14017 0

c  0-1 --> -1
c    (-b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧ -p_836) -> ( b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0)
c  in CNF:
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨  b^{22, 39}_2
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_1
c     b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨  b^{22, 39}_0
c  in DIMACS:
 14012  14013  14014  836  14015 0
 14012  14013  14014  836 -14016 0
 14012  14013  14014  836  14017 0

c  -1-1 --> -2
c    ( b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧  b^{22, 38}_0 ∧ -p_836) -> ( b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0)
c  in CNF:
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨  b^{22, 39}_2
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨  b^{22, 39}_1
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨  p_836 ∨ -b^{22, 39}_0
c  in DIMACS:
-14012  14013 -14014  836  14015 0
-14012  14013 -14014  836  14016 0
-14012  14013 -14014  836 -14017 0

c  -2-1 --> break 
c    ( b^{22, 38}_2 ∧  b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨  b^{22, 38}_0 ∨  p_836 ∨ break
c  in DIMACS:
-14012 -14013  14014  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 38}_2 ∧ -b^{22, 38}_1 ∧ -b^{22, 38}_0 ∧ true) 
c  in CNF:
c    -b^{22, 38}_2 ∨  b^{22, 38}_1 ∨  b^{22, 38}_0 ∨ false 
c  in DIMACS:
-14012  14013  14014  0

c  3 does not represent an automaton state.
c    -(-b^{22, 38}_2 ∧  b^{22, 38}_1 ∧  b^{22, 38}_0 ∧ true) 
c  in CNF:
c     b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ false 
c  in DIMACS:
 14012 -14013 -14014  0
c  -3 does not represent an automaton state.
c    -( b^{22, 38}_2 ∧  b^{22, 38}_1 ∧  b^{22, 38}_0 ∧ true) 
c  in CNF:
c    -b^{22, 38}_2 ∨ -b^{22, 38}_1 ∨ -b^{22, 38}_0 ∨ false 
c  in DIMACS:
-14012 -14013 -14014  0

c i = 39
c  -2+1 --> -1
c    ( b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧  p_858) -> ( b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0)
c  in CNF:
c    -b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨  b^{22, 40}_2
c    -b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_1
c    -b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨  b^{22, 40}_0
c  in DIMACS:
-14015 -14016  14017 -858  14018 0
-14015 -14016  14017 -858 -14019 0
-14015 -14016  14017 -858  14020 0

c  -1+1 --> 0
c    ( b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0 ∧  p_858) -> (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧ -b^{22, 40}_0)
c  in CNF:
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_2
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_1
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_0
c  in DIMACS:
-14015  14016 -14017 -858 -14018 0
-14015  14016 -14017 -858 -14019 0
-14015  14016 -14017 -858 -14020 0

c  0+1 --> 1
c    (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧  p_858) -> (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0)
c  in CNF:
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_2
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_1
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨  b^{22, 40}_0
c  in DIMACS:
 14015  14016  14017 -858 -14018 0
 14015  14016  14017 -858 -14019 0
 14015  14016  14017 -858  14020 0

c  1+1 --> 2
c    (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0 ∧  p_858) -> (-b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0)
c  in CNF:
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_2
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨  b^{22, 40}_1
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ -p_858 ∨ -b^{22, 40}_0
c  in DIMACS:
 14015  14016 -14017 -858 -14018 0
 14015  14016 -14017 -858  14019 0
 14015  14016 -14017 -858 -14020 0

c  2+1 --> break 
c    (-b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧  p_858) -> break
c  in CNF:
c     b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 14015 -14016  14017 -858 1162 0


c  2-1 --> 1
c    (-b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧ -p_858) -> (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0)
c  in CNF:
c     b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_2
c     b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_1
c     b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨  b^{22, 40}_0
c  in DIMACS:
 14015 -14016  14017  858 -14018 0
 14015 -14016  14017  858 -14019 0
 14015 -14016  14017  858  14020 0

c  1-1 --> 0
c    (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0 ∧ -p_858) -> (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧ -b^{22, 40}_0)
c  in CNF:
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_2
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_1
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_0
c  in DIMACS:
 14015  14016 -14017  858 -14018 0
 14015  14016 -14017  858 -14019 0
 14015  14016 -14017  858 -14020 0

c  0-1 --> -1
c    (-b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧ -p_858) -> ( b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0)
c  in CNF:
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨  b^{22, 40}_2
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_1
c     b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨  b^{22, 40}_0
c  in DIMACS:
 14015  14016  14017  858  14018 0
 14015  14016  14017  858 -14019 0
 14015  14016  14017  858  14020 0

c  -1-1 --> -2
c    ( b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧  b^{22, 39}_0 ∧ -p_858) -> ( b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0)
c  in CNF:
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨  b^{22, 40}_2
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨  b^{22, 40}_1
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨  p_858 ∨ -b^{22, 40}_0
c  in DIMACS:
-14015  14016 -14017  858  14018 0
-14015  14016 -14017  858  14019 0
-14015  14016 -14017  858 -14020 0

c  -2-1 --> break 
c    ( b^{22, 39}_2 ∧  b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨  b^{22, 39}_0 ∨  p_858 ∨ break
c  in DIMACS:
-14015 -14016  14017  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 39}_2 ∧ -b^{22, 39}_1 ∧ -b^{22, 39}_0 ∧ true) 
c  in CNF:
c    -b^{22, 39}_2 ∨  b^{22, 39}_1 ∨  b^{22, 39}_0 ∨ false 
c  in DIMACS:
-14015  14016  14017  0

c  3 does not represent an automaton state.
c    -(-b^{22, 39}_2 ∧  b^{22, 39}_1 ∧  b^{22, 39}_0 ∧ true) 
c  in CNF:
c     b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ false 
c  in DIMACS:
 14015 -14016 -14017  0
c  -3 does not represent an automaton state.
c    -( b^{22, 39}_2 ∧  b^{22, 39}_1 ∧  b^{22, 39}_0 ∧ true) 
c  in CNF:
c    -b^{22, 39}_2 ∨ -b^{22, 39}_1 ∨ -b^{22, 39}_0 ∨ false 
c  in DIMACS:
-14015 -14016 -14017  0

c i = 40
c  -2+1 --> -1
c    ( b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧  p_880) -> ( b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0)
c  in CNF:
c    -b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨  b^{22, 41}_2
c    -b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_1
c    -b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨  b^{22, 41}_0
c  in DIMACS:
-14018 -14019  14020 -880  14021 0
-14018 -14019  14020 -880 -14022 0
-14018 -14019  14020 -880  14023 0

c  -1+1 --> 0
c    ( b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0 ∧  p_880) -> (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧ -b^{22, 41}_0)
c  in CNF:
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_2
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_1
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_0
c  in DIMACS:
-14018  14019 -14020 -880 -14021 0
-14018  14019 -14020 -880 -14022 0
-14018  14019 -14020 -880 -14023 0

c  0+1 --> 1
c    (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧  p_880) -> (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0)
c  in CNF:
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_2
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_1
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨  b^{22, 41}_0
c  in DIMACS:
 14018  14019  14020 -880 -14021 0
 14018  14019  14020 -880 -14022 0
 14018  14019  14020 -880  14023 0

c  1+1 --> 2
c    (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0 ∧  p_880) -> (-b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0)
c  in CNF:
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_2
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨  b^{22, 41}_1
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ -p_880 ∨ -b^{22, 41}_0
c  in DIMACS:
 14018  14019 -14020 -880 -14021 0
 14018  14019 -14020 -880  14022 0
 14018  14019 -14020 -880 -14023 0

c  2+1 --> break 
c    (-b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧  p_880) -> break
c  in CNF:
c     b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 14018 -14019  14020 -880 1162 0


c  2-1 --> 1
c    (-b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧ -p_880) -> (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0)
c  in CNF:
c     b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_2
c     b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_1
c     b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨  b^{22, 41}_0
c  in DIMACS:
 14018 -14019  14020  880 -14021 0
 14018 -14019  14020  880 -14022 0
 14018 -14019  14020  880  14023 0

c  1-1 --> 0
c    (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0 ∧ -p_880) -> (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧ -b^{22, 41}_0)
c  in CNF:
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_2
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_1
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_0
c  in DIMACS:
 14018  14019 -14020  880 -14021 0
 14018  14019 -14020  880 -14022 0
 14018  14019 -14020  880 -14023 0

c  0-1 --> -1
c    (-b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧ -p_880) -> ( b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0)
c  in CNF:
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨  b^{22, 41}_2
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_1
c     b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨  b^{22, 41}_0
c  in DIMACS:
 14018  14019  14020  880  14021 0
 14018  14019  14020  880 -14022 0
 14018  14019  14020  880  14023 0

c  -1-1 --> -2
c    ( b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧  b^{22, 40}_0 ∧ -p_880) -> ( b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0)
c  in CNF:
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨  b^{22, 41}_2
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨  b^{22, 41}_1
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨  p_880 ∨ -b^{22, 41}_0
c  in DIMACS:
-14018  14019 -14020  880  14021 0
-14018  14019 -14020  880  14022 0
-14018  14019 -14020  880 -14023 0

c  -2-1 --> break 
c    ( b^{22, 40}_2 ∧  b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨  b^{22, 40}_0 ∨  p_880 ∨ break
c  in DIMACS:
-14018 -14019  14020  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 40}_2 ∧ -b^{22, 40}_1 ∧ -b^{22, 40}_0 ∧ true) 
c  in CNF:
c    -b^{22, 40}_2 ∨  b^{22, 40}_1 ∨  b^{22, 40}_0 ∨ false 
c  in DIMACS:
-14018  14019  14020  0

c  3 does not represent an automaton state.
c    -(-b^{22, 40}_2 ∧  b^{22, 40}_1 ∧  b^{22, 40}_0 ∧ true) 
c  in CNF:
c     b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ false 
c  in DIMACS:
 14018 -14019 -14020  0
c  -3 does not represent an automaton state.
c    -( b^{22, 40}_2 ∧  b^{22, 40}_1 ∧  b^{22, 40}_0 ∧ true) 
c  in CNF:
c    -b^{22, 40}_2 ∨ -b^{22, 40}_1 ∨ -b^{22, 40}_0 ∨ false 
c  in DIMACS:
-14018 -14019 -14020  0

c i = 41
c  -2+1 --> -1
c    ( b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧  p_902) -> ( b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0)
c  in CNF:
c    -b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨  b^{22, 42}_2
c    -b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_1
c    -b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨  b^{22, 42}_0
c  in DIMACS:
-14021 -14022  14023 -902  14024 0
-14021 -14022  14023 -902 -14025 0
-14021 -14022  14023 -902  14026 0

c  -1+1 --> 0
c    ( b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0 ∧  p_902) -> (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧ -b^{22, 42}_0)
c  in CNF:
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_2
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_1
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_0
c  in DIMACS:
-14021  14022 -14023 -902 -14024 0
-14021  14022 -14023 -902 -14025 0
-14021  14022 -14023 -902 -14026 0

c  0+1 --> 1
c    (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧  p_902) -> (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0)
c  in CNF:
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_2
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_1
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨  b^{22, 42}_0
c  in DIMACS:
 14021  14022  14023 -902 -14024 0
 14021  14022  14023 -902 -14025 0
 14021  14022  14023 -902  14026 0

c  1+1 --> 2
c    (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0 ∧  p_902) -> (-b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0)
c  in CNF:
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_2
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨  b^{22, 42}_1
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ -p_902 ∨ -b^{22, 42}_0
c  in DIMACS:
 14021  14022 -14023 -902 -14024 0
 14021  14022 -14023 -902  14025 0
 14021  14022 -14023 -902 -14026 0

c  2+1 --> break 
c    (-b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧  p_902) -> break
c  in CNF:
c     b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 14021 -14022  14023 -902 1162 0


c  2-1 --> 1
c    (-b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧ -p_902) -> (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0)
c  in CNF:
c     b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_2
c     b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_1
c     b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨  b^{22, 42}_0
c  in DIMACS:
 14021 -14022  14023  902 -14024 0
 14021 -14022  14023  902 -14025 0
 14021 -14022  14023  902  14026 0

c  1-1 --> 0
c    (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0 ∧ -p_902) -> (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧ -b^{22, 42}_0)
c  in CNF:
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_2
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_1
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_0
c  in DIMACS:
 14021  14022 -14023  902 -14024 0
 14021  14022 -14023  902 -14025 0
 14021  14022 -14023  902 -14026 0

c  0-1 --> -1
c    (-b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧ -p_902) -> ( b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0)
c  in CNF:
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨  b^{22, 42}_2
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_1
c     b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨  b^{22, 42}_0
c  in DIMACS:
 14021  14022  14023  902  14024 0
 14021  14022  14023  902 -14025 0
 14021  14022  14023  902  14026 0

c  -1-1 --> -2
c    ( b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧  b^{22, 41}_0 ∧ -p_902) -> ( b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0)
c  in CNF:
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨  b^{22, 42}_2
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨  b^{22, 42}_1
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨  p_902 ∨ -b^{22, 42}_0
c  in DIMACS:
-14021  14022 -14023  902  14024 0
-14021  14022 -14023  902  14025 0
-14021  14022 -14023  902 -14026 0

c  -2-1 --> break 
c    ( b^{22, 41}_2 ∧  b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨  b^{22, 41}_0 ∨  p_902 ∨ break
c  in DIMACS:
-14021 -14022  14023  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 41}_2 ∧ -b^{22, 41}_1 ∧ -b^{22, 41}_0 ∧ true) 
c  in CNF:
c    -b^{22, 41}_2 ∨  b^{22, 41}_1 ∨  b^{22, 41}_0 ∨ false 
c  in DIMACS:
-14021  14022  14023  0

c  3 does not represent an automaton state.
c    -(-b^{22, 41}_2 ∧  b^{22, 41}_1 ∧  b^{22, 41}_0 ∧ true) 
c  in CNF:
c     b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ false 
c  in DIMACS:
 14021 -14022 -14023  0
c  -3 does not represent an automaton state.
c    -( b^{22, 41}_2 ∧  b^{22, 41}_1 ∧  b^{22, 41}_0 ∧ true) 
c  in CNF:
c    -b^{22, 41}_2 ∨ -b^{22, 41}_1 ∨ -b^{22, 41}_0 ∨ false 
c  in DIMACS:
-14021 -14022 -14023  0

c i = 42
c  -2+1 --> -1
c    ( b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧  p_924) -> ( b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0)
c  in CNF:
c    -b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨  b^{22, 43}_2
c    -b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_1
c    -b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨  b^{22, 43}_0
c  in DIMACS:
-14024 -14025  14026 -924  14027 0
-14024 -14025  14026 -924 -14028 0
-14024 -14025  14026 -924  14029 0

c  -1+1 --> 0
c    ( b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0 ∧  p_924) -> (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧ -b^{22, 43}_0)
c  in CNF:
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_2
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_1
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_0
c  in DIMACS:
-14024  14025 -14026 -924 -14027 0
-14024  14025 -14026 -924 -14028 0
-14024  14025 -14026 -924 -14029 0

c  0+1 --> 1
c    (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧  p_924) -> (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0)
c  in CNF:
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_2
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_1
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨  b^{22, 43}_0
c  in DIMACS:
 14024  14025  14026 -924 -14027 0
 14024  14025  14026 -924 -14028 0
 14024  14025  14026 -924  14029 0

c  1+1 --> 2
c    (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0 ∧  p_924) -> (-b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0)
c  in CNF:
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_2
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨  b^{22, 43}_1
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ -p_924 ∨ -b^{22, 43}_0
c  in DIMACS:
 14024  14025 -14026 -924 -14027 0
 14024  14025 -14026 -924  14028 0
 14024  14025 -14026 -924 -14029 0

c  2+1 --> break 
c    (-b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧  p_924) -> break
c  in CNF:
c     b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 14024 -14025  14026 -924 1162 0


c  2-1 --> 1
c    (-b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧ -p_924) -> (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0)
c  in CNF:
c     b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_2
c     b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_1
c     b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨  b^{22, 43}_0
c  in DIMACS:
 14024 -14025  14026  924 -14027 0
 14024 -14025  14026  924 -14028 0
 14024 -14025  14026  924  14029 0

c  1-1 --> 0
c    (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0 ∧ -p_924) -> (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧ -b^{22, 43}_0)
c  in CNF:
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_2
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_1
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_0
c  in DIMACS:
 14024  14025 -14026  924 -14027 0
 14024  14025 -14026  924 -14028 0
 14024  14025 -14026  924 -14029 0

c  0-1 --> -1
c    (-b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧ -p_924) -> ( b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0)
c  in CNF:
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨  b^{22, 43}_2
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_1
c     b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨  b^{22, 43}_0
c  in DIMACS:
 14024  14025  14026  924  14027 0
 14024  14025  14026  924 -14028 0
 14024  14025  14026  924  14029 0

c  -1-1 --> -2
c    ( b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧  b^{22, 42}_0 ∧ -p_924) -> ( b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0)
c  in CNF:
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨  b^{22, 43}_2
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨  b^{22, 43}_1
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨  p_924 ∨ -b^{22, 43}_0
c  in DIMACS:
-14024  14025 -14026  924  14027 0
-14024  14025 -14026  924  14028 0
-14024  14025 -14026  924 -14029 0

c  -2-1 --> break 
c    ( b^{22, 42}_2 ∧  b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨  b^{22, 42}_0 ∨  p_924 ∨ break
c  in DIMACS:
-14024 -14025  14026  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 42}_2 ∧ -b^{22, 42}_1 ∧ -b^{22, 42}_0 ∧ true) 
c  in CNF:
c    -b^{22, 42}_2 ∨  b^{22, 42}_1 ∨  b^{22, 42}_0 ∨ false 
c  in DIMACS:
-14024  14025  14026  0

c  3 does not represent an automaton state.
c    -(-b^{22, 42}_2 ∧  b^{22, 42}_1 ∧  b^{22, 42}_0 ∧ true) 
c  in CNF:
c     b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ false 
c  in DIMACS:
 14024 -14025 -14026  0
c  -3 does not represent an automaton state.
c    -( b^{22, 42}_2 ∧  b^{22, 42}_1 ∧  b^{22, 42}_0 ∧ true) 
c  in CNF:
c    -b^{22, 42}_2 ∨ -b^{22, 42}_1 ∨ -b^{22, 42}_0 ∨ false 
c  in DIMACS:
-14024 -14025 -14026  0

c i = 43
c  -2+1 --> -1
c    ( b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧  p_946) -> ( b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0)
c  in CNF:
c    -b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨  b^{22, 44}_2
c    -b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_1
c    -b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨  b^{22, 44}_0
c  in DIMACS:
-14027 -14028  14029 -946  14030 0
-14027 -14028  14029 -946 -14031 0
-14027 -14028  14029 -946  14032 0

c  -1+1 --> 0
c    ( b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0 ∧  p_946) -> (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧ -b^{22, 44}_0)
c  in CNF:
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_2
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_1
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_0
c  in DIMACS:
-14027  14028 -14029 -946 -14030 0
-14027  14028 -14029 -946 -14031 0
-14027  14028 -14029 -946 -14032 0

c  0+1 --> 1
c    (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧  p_946) -> (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0)
c  in CNF:
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_2
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_1
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨  b^{22, 44}_0
c  in DIMACS:
 14027  14028  14029 -946 -14030 0
 14027  14028  14029 -946 -14031 0
 14027  14028  14029 -946  14032 0

c  1+1 --> 2
c    (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0 ∧  p_946) -> (-b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0)
c  in CNF:
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_2
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨  b^{22, 44}_1
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ -p_946 ∨ -b^{22, 44}_0
c  in DIMACS:
 14027  14028 -14029 -946 -14030 0
 14027  14028 -14029 -946  14031 0
 14027  14028 -14029 -946 -14032 0

c  2+1 --> break 
c    (-b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧  p_946) -> break
c  in CNF:
c     b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 14027 -14028  14029 -946 1162 0


c  2-1 --> 1
c    (-b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧ -p_946) -> (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0)
c  in CNF:
c     b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_2
c     b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_1
c     b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨  b^{22, 44}_0
c  in DIMACS:
 14027 -14028  14029  946 -14030 0
 14027 -14028  14029  946 -14031 0
 14027 -14028  14029  946  14032 0

c  1-1 --> 0
c    (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0 ∧ -p_946) -> (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧ -b^{22, 44}_0)
c  in CNF:
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_2
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_1
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_0
c  in DIMACS:
 14027  14028 -14029  946 -14030 0
 14027  14028 -14029  946 -14031 0
 14027  14028 -14029  946 -14032 0

c  0-1 --> -1
c    (-b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧ -p_946) -> ( b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0)
c  in CNF:
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨  b^{22, 44}_2
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_1
c     b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨  b^{22, 44}_0
c  in DIMACS:
 14027  14028  14029  946  14030 0
 14027  14028  14029  946 -14031 0
 14027  14028  14029  946  14032 0

c  -1-1 --> -2
c    ( b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧  b^{22, 43}_0 ∧ -p_946) -> ( b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0)
c  in CNF:
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨  b^{22, 44}_2
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨  b^{22, 44}_1
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨  p_946 ∨ -b^{22, 44}_0
c  in DIMACS:
-14027  14028 -14029  946  14030 0
-14027  14028 -14029  946  14031 0
-14027  14028 -14029  946 -14032 0

c  -2-1 --> break 
c    ( b^{22, 43}_2 ∧  b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨  b^{22, 43}_0 ∨  p_946 ∨ break
c  in DIMACS:
-14027 -14028  14029  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 43}_2 ∧ -b^{22, 43}_1 ∧ -b^{22, 43}_0 ∧ true) 
c  in CNF:
c    -b^{22, 43}_2 ∨  b^{22, 43}_1 ∨  b^{22, 43}_0 ∨ false 
c  in DIMACS:
-14027  14028  14029  0

c  3 does not represent an automaton state.
c    -(-b^{22, 43}_2 ∧  b^{22, 43}_1 ∧  b^{22, 43}_0 ∧ true) 
c  in CNF:
c     b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ false 
c  in DIMACS:
 14027 -14028 -14029  0
c  -3 does not represent an automaton state.
c    -( b^{22, 43}_2 ∧  b^{22, 43}_1 ∧  b^{22, 43}_0 ∧ true) 
c  in CNF:
c    -b^{22, 43}_2 ∨ -b^{22, 43}_1 ∨ -b^{22, 43}_0 ∨ false 
c  in DIMACS:
-14027 -14028 -14029  0

c i = 44
c  -2+1 --> -1
c    ( b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧  p_968) -> ( b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0)
c  in CNF:
c    -b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨  b^{22, 45}_2
c    -b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_1
c    -b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨  b^{22, 45}_0
c  in DIMACS:
-14030 -14031  14032 -968  14033 0
-14030 -14031  14032 -968 -14034 0
-14030 -14031  14032 -968  14035 0

c  -1+1 --> 0
c    ( b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0 ∧  p_968) -> (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧ -b^{22, 45}_0)
c  in CNF:
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_2
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_1
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_0
c  in DIMACS:
-14030  14031 -14032 -968 -14033 0
-14030  14031 -14032 -968 -14034 0
-14030  14031 -14032 -968 -14035 0

c  0+1 --> 1
c    (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧  p_968) -> (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0)
c  in CNF:
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_2
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_1
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨  b^{22, 45}_0
c  in DIMACS:
 14030  14031  14032 -968 -14033 0
 14030  14031  14032 -968 -14034 0
 14030  14031  14032 -968  14035 0

c  1+1 --> 2
c    (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0 ∧  p_968) -> (-b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0)
c  in CNF:
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_2
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨  b^{22, 45}_1
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ -p_968 ∨ -b^{22, 45}_0
c  in DIMACS:
 14030  14031 -14032 -968 -14033 0
 14030  14031 -14032 -968  14034 0
 14030  14031 -14032 -968 -14035 0

c  2+1 --> break 
c    (-b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧  p_968) -> break
c  in CNF:
c     b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 14030 -14031  14032 -968 1162 0


c  2-1 --> 1
c    (-b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧ -p_968) -> (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0)
c  in CNF:
c     b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_2
c     b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_1
c     b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨  b^{22, 45}_0
c  in DIMACS:
 14030 -14031  14032  968 -14033 0
 14030 -14031  14032  968 -14034 0
 14030 -14031  14032  968  14035 0

c  1-1 --> 0
c    (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0 ∧ -p_968) -> (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧ -b^{22, 45}_0)
c  in CNF:
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_2
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_1
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_0
c  in DIMACS:
 14030  14031 -14032  968 -14033 0
 14030  14031 -14032  968 -14034 0
 14030  14031 -14032  968 -14035 0

c  0-1 --> -1
c    (-b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧ -p_968) -> ( b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0)
c  in CNF:
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨  b^{22, 45}_2
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_1
c     b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨  b^{22, 45}_0
c  in DIMACS:
 14030  14031  14032  968  14033 0
 14030  14031  14032  968 -14034 0
 14030  14031  14032  968  14035 0

c  -1-1 --> -2
c    ( b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧  b^{22, 44}_0 ∧ -p_968) -> ( b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0)
c  in CNF:
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨  b^{22, 45}_2
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨  b^{22, 45}_1
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨  p_968 ∨ -b^{22, 45}_0
c  in DIMACS:
-14030  14031 -14032  968  14033 0
-14030  14031 -14032  968  14034 0
-14030  14031 -14032  968 -14035 0

c  -2-1 --> break 
c    ( b^{22, 44}_2 ∧  b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨  b^{22, 44}_0 ∨  p_968 ∨ break
c  in DIMACS:
-14030 -14031  14032  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 44}_2 ∧ -b^{22, 44}_1 ∧ -b^{22, 44}_0 ∧ true) 
c  in CNF:
c    -b^{22, 44}_2 ∨  b^{22, 44}_1 ∨  b^{22, 44}_0 ∨ false 
c  in DIMACS:
-14030  14031  14032  0

c  3 does not represent an automaton state.
c    -(-b^{22, 44}_2 ∧  b^{22, 44}_1 ∧  b^{22, 44}_0 ∧ true) 
c  in CNF:
c     b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ false 
c  in DIMACS:
 14030 -14031 -14032  0
c  -3 does not represent an automaton state.
c    -( b^{22, 44}_2 ∧  b^{22, 44}_1 ∧  b^{22, 44}_0 ∧ true) 
c  in CNF:
c    -b^{22, 44}_2 ∨ -b^{22, 44}_1 ∨ -b^{22, 44}_0 ∨ false 
c  in DIMACS:
-14030 -14031 -14032  0

c i = 45
c  -2+1 --> -1
c    ( b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧  p_990) -> ( b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0)
c  in CNF:
c    -b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨  b^{22, 46}_2
c    -b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_1
c    -b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨  b^{22, 46}_0
c  in DIMACS:
-14033 -14034  14035 -990  14036 0
-14033 -14034  14035 -990 -14037 0
-14033 -14034  14035 -990  14038 0

c  -1+1 --> 0
c    ( b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0 ∧  p_990) -> (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧ -b^{22, 46}_0)
c  in CNF:
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_2
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_1
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_0
c  in DIMACS:
-14033  14034 -14035 -990 -14036 0
-14033  14034 -14035 -990 -14037 0
-14033  14034 -14035 -990 -14038 0

c  0+1 --> 1
c    (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧  p_990) -> (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0)
c  in CNF:
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_2
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_1
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨  b^{22, 46}_0
c  in DIMACS:
 14033  14034  14035 -990 -14036 0
 14033  14034  14035 -990 -14037 0
 14033  14034  14035 -990  14038 0

c  1+1 --> 2
c    (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0 ∧  p_990) -> (-b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0)
c  in CNF:
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_2
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨  b^{22, 46}_1
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ -p_990 ∨ -b^{22, 46}_0
c  in DIMACS:
 14033  14034 -14035 -990 -14036 0
 14033  14034 -14035 -990  14037 0
 14033  14034 -14035 -990 -14038 0

c  2+1 --> break 
c    (-b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧  p_990) -> break
c  in CNF:
c     b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 14033 -14034  14035 -990 1162 0


c  2-1 --> 1
c    (-b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧ -p_990) -> (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0)
c  in CNF:
c     b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_2
c     b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_1
c     b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨  b^{22, 46}_0
c  in DIMACS:
 14033 -14034  14035  990 -14036 0
 14033 -14034  14035  990 -14037 0
 14033 -14034  14035  990  14038 0

c  1-1 --> 0
c    (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0 ∧ -p_990) -> (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧ -b^{22, 46}_0)
c  in CNF:
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_2
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_1
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_0
c  in DIMACS:
 14033  14034 -14035  990 -14036 0
 14033  14034 -14035  990 -14037 0
 14033  14034 -14035  990 -14038 0

c  0-1 --> -1
c    (-b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧ -p_990) -> ( b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0)
c  in CNF:
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨  b^{22, 46}_2
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_1
c     b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨  b^{22, 46}_0
c  in DIMACS:
 14033  14034  14035  990  14036 0
 14033  14034  14035  990 -14037 0
 14033  14034  14035  990  14038 0

c  -1-1 --> -2
c    ( b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧  b^{22, 45}_0 ∧ -p_990) -> ( b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0)
c  in CNF:
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨  b^{22, 46}_2
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨  b^{22, 46}_1
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨  p_990 ∨ -b^{22, 46}_0
c  in DIMACS:
-14033  14034 -14035  990  14036 0
-14033  14034 -14035  990  14037 0
-14033  14034 -14035  990 -14038 0

c  -2-1 --> break 
c    ( b^{22, 45}_2 ∧  b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨  b^{22, 45}_0 ∨  p_990 ∨ break
c  in DIMACS:
-14033 -14034  14035  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 45}_2 ∧ -b^{22, 45}_1 ∧ -b^{22, 45}_0 ∧ true) 
c  in CNF:
c    -b^{22, 45}_2 ∨  b^{22, 45}_1 ∨  b^{22, 45}_0 ∨ false 
c  in DIMACS:
-14033  14034  14035  0

c  3 does not represent an automaton state.
c    -(-b^{22, 45}_2 ∧  b^{22, 45}_1 ∧  b^{22, 45}_0 ∧ true) 
c  in CNF:
c     b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ false 
c  in DIMACS:
 14033 -14034 -14035  0
c  -3 does not represent an automaton state.
c    -( b^{22, 45}_2 ∧  b^{22, 45}_1 ∧  b^{22, 45}_0 ∧ true) 
c  in CNF:
c    -b^{22, 45}_2 ∨ -b^{22, 45}_1 ∨ -b^{22, 45}_0 ∨ false 
c  in DIMACS:
-14033 -14034 -14035  0

c i = 46
c  -2+1 --> -1
c    ( b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧  p_1012) -> ( b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0)
c  in CNF:
c    -b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨  b^{22, 47}_2
c    -b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_1
c    -b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨  b^{22, 47}_0
c  in DIMACS:
-14036 -14037  14038 -1012  14039 0
-14036 -14037  14038 -1012 -14040 0
-14036 -14037  14038 -1012  14041 0

c  -1+1 --> 0
c    ( b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0 ∧  p_1012) -> (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧ -b^{22, 47}_0)
c  in CNF:
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_2
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_1
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_0
c  in DIMACS:
-14036  14037 -14038 -1012 -14039 0
-14036  14037 -14038 -1012 -14040 0
-14036  14037 -14038 -1012 -14041 0

c  0+1 --> 1
c    (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧  p_1012) -> (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0)
c  in CNF:
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_2
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_1
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨  b^{22, 47}_0
c  in DIMACS:
 14036  14037  14038 -1012 -14039 0
 14036  14037  14038 -1012 -14040 0
 14036  14037  14038 -1012  14041 0

c  1+1 --> 2
c    (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0 ∧  p_1012) -> (-b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0)
c  in CNF:
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_2
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨  b^{22, 47}_1
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ -p_1012 ∨ -b^{22, 47}_0
c  in DIMACS:
 14036  14037 -14038 -1012 -14039 0
 14036  14037 -14038 -1012  14040 0
 14036  14037 -14038 -1012 -14041 0

c  2+1 --> break 
c    (-b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 14036 -14037  14038 -1012 1162 0


c  2-1 --> 1
c    (-b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧ -p_1012) -> (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0)
c  in CNF:
c     b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_2
c     b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_1
c     b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨  b^{22, 47}_0
c  in DIMACS:
 14036 -14037  14038  1012 -14039 0
 14036 -14037  14038  1012 -14040 0
 14036 -14037  14038  1012  14041 0

c  1-1 --> 0
c    (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0 ∧ -p_1012) -> (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧ -b^{22, 47}_0)
c  in CNF:
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_2
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_1
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_0
c  in DIMACS:
 14036  14037 -14038  1012 -14039 0
 14036  14037 -14038  1012 -14040 0
 14036  14037 -14038  1012 -14041 0

c  0-1 --> -1
c    (-b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧ -p_1012) -> ( b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0)
c  in CNF:
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨  b^{22, 47}_2
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_1
c     b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨  b^{22, 47}_0
c  in DIMACS:
 14036  14037  14038  1012  14039 0
 14036  14037  14038  1012 -14040 0
 14036  14037  14038  1012  14041 0

c  -1-1 --> -2
c    ( b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧  b^{22, 46}_0 ∧ -p_1012) -> ( b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0)
c  in CNF:
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨  b^{22, 47}_2
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨  b^{22, 47}_1
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨  p_1012 ∨ -b^{22, 47}_0
c  in DIMACS:
-14036  14037 -14038  1012  14039 0
-14036  14037 -14038  1012  14040 0
-14036  14037 -14038  1012 -14041 0

c  -2-1 --> break 
c    ( b^{22, 46}_2 ∧  b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨  b^{22, 46}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-14036 -14037  14038  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 46}_2 ∧ -b^{22, 46}_1 ∧ -b^{22, 46}_0 ∧ true) 
c  in CNF:
c    -b^{22, 46}_2 ∨  b^{22, 46}_1 ∨  b^{22, 46}_0 ∨ false 
c  in DIMACS:
-14036  14037  14038  0

c  3 does not represent an automaton state.
c    -(-b^{22, 46}_2 ∧  b^{22, 46}_1 ∧  b^{22, 46}_0 ∧ true) 
c  in CNF:
c     b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ false 
c  in DIMACS:
 14036 -14037 -14038  0
c  -3 does not represent an automaton state.
c    -( b^{22, 46}_2 ∧  b^{22, 46}_1 ∧  b^{22, 46}_0 ∧ true) 
c  in CNF:
c    -b^{22, 46}_2 ∨ -b^{22, 46}_1 ∨ -b^{22, 46}_0 ∨ false 
c  in DIMACS:
-14036 -14037 -14038  0

c i = 47
c  -2+1 --> -1
c    ( b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧  p_1034) -> ( b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0)
c  in CNF:
c    -b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨  b^{22, 48}_2
c    -b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_1
c    -b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨  b^{22, 48}_0
c  in DIMACS:
-14039 -14040  14041 -1034  14042 0
-14039 -14040  14041 -1034 -14043 0
-14039 -14040  14041 -1034  14044 0

c  -1+1 --> 0
c    ( b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0 ∧  p_1034) -> (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧ -b^{22, 48}_0)
c  in CNF:
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_2
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_1
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_0
c  in DIMACS:
-14039  14040 -14041 -1034 -14042 0
-14039  14040 -14041 -1034 -14043 0
-14039  14040 -14041 -1034 -14044 0

c  0+1 --> 1
c    (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧  p_1034) -> (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0)
c  in CNF:
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_2
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_1
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨  b^{22, 48}_0
c  in DIMACS:
 14039  14040  14041 -1034 -14042 0
 14039  14040  14041 -1034 -14043 0
 14039  14040  14041 -1034  14044 0

c  1+1 --> 2
c    (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0 ∧  p_1034) -> (-b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0)
c  in CNF:
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_2
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨  b^{22, 48}_1
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ -p_1034 ∨ -b^{22, 48}_0
c  in DIMACS:
 14039  14040 -14041 -1034 -14042 0
 14039  14040 -14041 -1034  14043 0
 14039  14040 -14041 -1034 -14044 0

c  2+1 --> break 
c    (-b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 14039 -14040  14041 -1034 1162 0


c  2-1 --> 1
c    (-b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧ -p_1034) -> (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0)
c  in CNF:
c     b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_2
c     b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_1
c     b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨  b^{22, 48}_0
c  in DIMACS:
 14039 -14040  14041  1034 -14042 0
 14039 -14040  14041  1034 -14043 0
 14039 -14040  14041  1034  14044 0

c  1-1 --> 0
c    (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0 ∧ -p_1034) -> (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧ -b^{22, 48}_0)
c  in CNF:
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_2
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_1
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_0
c  in DIMACS:
 14039  14040 -14041  1034 -14042 0
 14039  14040 -14041  1034 -14043 0
 14039  14040 -14041  1034 -14044 0

c  0-1 --> -1
c    (-b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧ -p_1034) -> ( b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0)
c  in CNF:
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨  b^{22, 48}_2
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_1
c     b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨  b^{22, 48}_0
c  in DIMACS:
 14039  14040  14041  1034  14042 0
 14039  14040  14041  1034 -14043 0
 14039  14040  14041  1034  14044 0

c  -1-1 --> -2
c    ( b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧  b^{22, 47}_0 ∧ -p_1034) -> ( b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0)
c  in CNF:
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨  b^{22, 48}_2
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨  b^{22, 48}_1
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨  p_1034 ∨ -b^{22, 48}_0
c  in DIMACS:
-14039  14040 -14041  1034  14042 0
-14039  14040 -14041  1034  14043 0
-14039  14040 -14041  1034 -14044 0

c  -2-1 --> break 
c    ( b^{22, 47}_2 ∧  b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨  b^{22, 47}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-14039 -14040  14041  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 47}_2 ∧ -b^{22, 47}_1 ∧ -b^{22, 47}_0 ∧ true) 
c  in CNF:
c    -b^{22, 47}_2 ∨  b^{22, 47}_1 ∨  b^{22, 47}_0 ∨ false 
c  in DIMACS:
-14039  14040  14041  0

c  3 does not represent an automaton state.
c    -(-b^{22, 47}_2 ∧  b^{22, 47}_1 ∧  b^{22, 47}_0 ∧ true) 
c  in CNF:
c     b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ false 
c  in DIMACS:
 14039 -14040 -14041  0
c  -3 does not represent an automaton state.
c    -( b^{22, 47}_2 ∧  b^{22, 47}_1 ∧  b^{22, 47}_0 ∧ true) 
c  in CNF:
c    -b^{22, 47}_2 ∨ -b^{22, 47}_1 ∨ -b^{22, 47}_0 ∨ false 
c  in DIMACS:
-14039 -14040 -14041  0

c i = 48
c  -2+1 --> -1
c    ( b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧  p_1056) -> ( b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0)
c  in CNF:
c    -b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨  b^{22, 49}_2
c    -b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_1
c    -b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨  b^{22, 49}_0
c  in DIMACS:
-14042 -14043  14044 -1056  14045 0
-14042 -14043  14044 -1056 -14046 0
-14042 -14043  14044 -1056  14047 0

c  -1+1 --> 0
c    ( b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0 ∧  p_1056) -> (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧ -b^{22, 49}_0)
c  in CNF:
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_2
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_1
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_0
c  in DIMACS:
-14042  14043 -14044 -1056 -14045 0
-14042  14043 -14044 -1056 -14046 0
-14042  14043 -14044 -1056 -14047 0

c  0+1 --> 1
c    (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧  p_1056) -> (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0)
c  in CNF:
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_2
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_1
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨  b^{22, 49}_0
c  in DIMACS:
 14042  14043  14044 -1056 -14045 0
 14042  14043  14044 -1056 -14046 0
 14042  14043  14044 -1056  14047 0

c  1+1 --> 2
c    (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0 ∧  p_1056) -> (-b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0)
c  in CNF:
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_2
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨  b^{22, 49}_1
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ -p_1056 ∨ -b^{22, 49}_0
c  in DIMACS:
 14042  14043 -14044 -1056 -14045 0
 14042  14043 -14044 -1056  14046 0
 14042  14043 -14044 -1056 -14047 0

c  2+1 --> break 
c    (-b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 14042 -14043  14044 -1056 1162 0


c  2-1 --> 1
c    (-b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧ -p_1056) -> (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0)
c  in CNF:
c     b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_2
c     b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_1
c     b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨  b^{22, 49}_0
c  in DIMACS:
 14042 -14043  14044  1056 -14045 0
 14042 -14043  14044  1056 -14046 0
 14042 -14043  14044  1056  14047 0

c  1-1 --> 0
c    (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0 ∧ -p_1056) -> (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧ -b^{22, 49}_0)
c  in CNF:
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_2
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_1
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_0
c  in DIMACS:
 14042  14043 -14044  1056 -14045 0
 14042  14043 -14044  1056 -14046 0
 14042  14043 -14044  1056 -14047 0

c  0-1 --> -1
c    (-b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧ -p_1056) -> ( b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0)
c  in CNF:
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨  b^{22, 49}_2
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_1
c     b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨  b^{22, 49}_0
c  in DIMACS:
 14042  14043  14044  1056  14045 0
 14042  14043  14044  1056 -14046 0
 14042  14043  14044  1056  14047 0

c  -1-1 --> -2
c    ( b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧  b^{22, 48}_0 ∧ -p_1056) -> ( b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0)
c  in CNF:
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨  b^{22, 49}_2
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨  b^{22, 49}_1
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨  p_1056 ∨ -b^{22, 49}_0
c  in DIMACS:
-14042  14043 -14044  1056  14045 0
-14042  14043 -14044  1056  14046 0
-14042  14043 -14044  1056 -14047 0

c  -2-1 --> break 
c    ( b^{22, 48}_2 ∧  b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨  b^{22, 48}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-14042 -14043  14044  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 48}_2 ∧ -b^{22, 48}_1 ∧ -b^{22, 48}_0 ∧ true) 
c  in CNF:
c    -b^{22, 48}_2 ∨  b^{22, 48}_1 ∨  b^{22, 48}_0 ∨ false 
c  in DIMACS:
-14042  14043  14044  0

c  3 does not represent an automaton state.
c    -(-b^{22, 48}_2 ∧  b^{22, 48}_1 ∧  b^{22, 48}_0 ∧ true) 
c  in CNF:
c     b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ false 
c  in DIMACS:
 14042 -14043 -14044  0
c  -3 does not represent an automaton state.
c    -( b^{22, 48}_2 ∧  b^{22, 48}_1 ∧  b^{22, 48}_0 ∧ true) 
c  in CNF:
c    -b^{22, 48}_2 ∨ -b^{22, 48}_1 ∨ -b^{22, 48}_0 ∨ false 
c  in DIMACS:
-14042 -14043 -14044  0

c i = 49
c  -2+1 --> -1
c    ( b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧  p_1078) -> ( b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0)
c  in CNF:
c    -b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨  b^{22, 50}_2
c    -b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_1
c    -b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨  b^{22, 50}_0
c  in DIMACS:
-14045 -14046  14047 -1078  14048 0
-14045 -14046  14047 -1078 -14049 0
-14045 -14046  14047 -1078  14050 0

c  -1+1 --> 0
c    ( b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0 ∧  p_1078) -> (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧ -b^{22, 50}_0)
c  in CNF:
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_2
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_1
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_0
c  in DIMACS:
-14045  14046 -14047 -1078 -14048 0
-14045  14046 -14047 -1078 -14049 0
-14045  14046 -14047 -1078 -14050 0

c  0+1 --> 1
c    (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧  p_1078) -> (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0)
c  in CNF:
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_2
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_1
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨  b^{22, 50}_0
c  in DIMACS:
 14045  14046  14047 -1078 -14048 0
 14045  14046  14047 -1078 -14049 0
 14045  14046  14047 -1078  14050 0

c  1+1 --> 2
c    (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0 ∧  p_1078) -> (-b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0)
c  in CNF:
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_2
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨  b^{22, 50}_1
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ -p_1078 ∨ -b^{22, 50}_0
c  in DIMACS:
 14045  14046 -14047 -1078 -14048 0
 14045  14046 -14047 -1078  14049 0
 14045  14046 -14047 -1078 -14050 0

c  2+1 --> break 
c    (-b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 14045 -14046  14047 -1078 1162 0


c  2-1 --> 1
c    (-b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧ -p_1078) -> (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0)
c  in CNF:
c     b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_2
c     b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_1
c     b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨  b^{22, 50}_0
c  in DIMACS:
 14045 -14046  14047  1078 -14048 0
 14045 -14046  14047  1078 -14049 0
 14045 -14046  14047  1078  14050 0

c  1-1 --> 0
c    (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0 ∧ -p_1078) -> (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧ -b^{22, 50}_0)
c  in CNF:
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_2
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_1
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_0
c  in DIMACS:
 14045  14046 -14047  1078 -14048 0
 14045  14046 -14047  1078 -14049 0
 14045  14046 -14047  1078 -14050 0

c  0-1 --> -1
c    (-b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧ -p_1078) -> ( b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0)
c  in CNF:
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨  b^{22, 50}_2
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_1
c     b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨  b^{22, 50}_0
c  in DIMACS:
 14045  14046  14047  1078  14048 0
 14045  14046  14047  1078 -14049 0
 14045  14046  14047  1078  14050 0

c  -1-1 --> -2
c    ( b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧  b^{22, 49}_0 ∧ -p_1078) -> ( b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0)
c  in CNF:
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨  b^{22, 50}_2
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨  b^{22, 50}_1
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨  p_1078 ∨ -b^{22, 50}_0
c  in DIMACS:
-14045  14046 -14047  1078  14048 0
-14045  14046 -14047  1078  14049 0
-14045  14046 -14047  1078 -14050 0

c  -2-1 --> break 
c    ( b^{22, 49}_2 ∧  b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨  b^{22, 49}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-14045 -14046  14047  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 49}_2 ∧ -b^{22, 49}_1 ∧ -b^{22, 49}_0 ∧ true) 
c  in CNF:
c    -b^{22, 49}_2 ∨  b^{22, 49}_1 ∨  b^{22, 49}_0 ∨ false 
c  in DIMACS:
-14045  14046  14047  0

c  3 does not represent an automaton state.
c    -(-b^{22, 49}_2 ∧  b^{22, 49}_1 ∧  b^{22, 49}_0 ∧ true) 
c  in CNF:
c     b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ false 
c  in DIMACS:
 14045 -14046 -14047  0
c  -3 does not represent an automaton state.
c    -( b^{22, 49}_2 ∧  b^{22, 49}_1 ∧  b^{22, 49}_0 ∧ true) 
c  in CNF:
c    -b^{22, 49}_2 ∨ -b^{22, 49}_1 ∨ -b^{22, 49}_0 ∨ false 
c  in DIMACS:
-14045 -14046 -14047  0

c i = 50
c  -2+1 --> -1
c    ( b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧  p_1100) -> ( b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0)
c  in CNF:
c    -b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨  b^{22, 51}_2
c    -b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_1
c    -b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨  b^{22, 51}_0
c  in DIMACS:
-14048 -14049  14050 -1100  14051 0
-14048 -14049  14050 -1100 -14052 0
-14048 -14049  14050 -1100  14053 0

c  -1+1 --> 0
c    ( b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0 ∧  p_1100) -> (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧ -b^{22, 51}_0)
c  in CNF:
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_2
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_1
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_0
c  in DIMACS:
-14048  14049 -14050 -1100 -14051 0
-14048  14049 -14050 -1100 -14052 0
-14048  14049 -14050 -1100 -14053 0

c  0+1 --> 1
c    (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧  p_1100) -> (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0)
c  in CNF:
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_2
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_1
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨  b^{22, 51}_0
c  in DIMACS:
 14048  14049  14050 -1100 -14051 0
 14048  14049  14050 -1100 -14052 0
 14048  14049  14050 -1100  14053 0

c  1+1 --> 2
c    (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0 ∧  p_1100) -> (-b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0)
c  in CNF:
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_2
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨  b^{22, 51}_1
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ -p_1100 ∨ -b^{22, 51}_0
c  in DIMACS:
 14048  14049 -14050 -1100 -14051 0
 14048  14049 -14050 -1100  14052 0
 14048  14049 -14050 -1100 -14053 0

c  2+1 --> break 
c    (-b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 14048 -14049  14050 -1100 1162 0


c  2-1 --> 1
c    (-b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧ -p_1100) -> (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0)
c  in CNF:
c     b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_2
c     b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_1
c     b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨  b^{22, 51}_0
c  in DIMACS:
 14048 -14049  14050  1100 -14051 0
 14048 -14049  14050  1100 -14052 0
 14048 -14049  14050  1100  14053 0

c  1-1 --> 0
c    (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0 ∧ -p_1100) -> (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧ -b^{22, 51}_0)
c  in CNF:
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_2
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_1
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_0
c  in DIMACS:
 14048  14049 -14050  1100 -14051 0
 14048  14049 -14050  1100 -14052 0
 14048  14049 -14050  1100 -14053 0

c  0-1 --> -1
c    (-b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧ -p_1100) -> ( b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0)
c  in CNF:
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨  b^{22, 51}_2
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_1
c     b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨  b^{22, 51}_0
c  in DIMACS:
 14048  14049  14050  1100  14051 0
 14048  14049  14050  1100 -14052 0
 14048  14049  14050  1100  14053 0

c  -1-1 --> -2
c    ( b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧  b^{22, 50}_0 ∧ -p_1100) -> ( b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0)
c  in CNF:
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨  b^{22, 51}_2
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨  b^{22, 51}_1
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨  p_1100 ∨ -b^{22, 51}_0
c  in DIMACS:
-14048  14049 -14050  1100  14051 0
-14048  14049 -14050  1100  14052 0
-14048  14049 -14050  1100 -14053 0

c  -2-1 --> break 
c    ( b^{22, 50}_2 ∧  b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨  b^{22, 50}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-14048 -14049  14050  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 50}_2 ∧ -b^{22, 50}_1 ∧ -b^{22, 50}_0 ∧ true) 
c  in CNF:
c    -b^{22, 50}_2 ∨  b^{22, 50}_1 ∨  b^{22, 50}_0 ∨ false 
c  in DIMACS:
-14048  14049  14050  0

c  3 does not represent an automaton state.
c    -(-b^{22, 50}_2 ∧  b^{22, 50}_1 ∧  b^{22, 50}_0 ∧ true) 
c  in CNF:
c     b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ false 
c  in DIMACS:
 14048 -14049 -14050  0
c  -3 does not represent an automaton state.
c    -( b^{22, 50}_2 ∧  b^{22, 50}_1 ∧  b^{22, 50}_0 ∧ true) 
c  in CNF:
c    -b^{22, 50}_2 ∨ -b^{22, 50}_1 ∨ -b^{22, 50}_0 ∨ false 
c  in DIMACS:
-14048 -14049 -14050  0

c i = 51
c  -2+1 --> -1
c    ( b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧  p_1122) -> ( b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0)
c  in CNF:
c    -b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨  b^{22, 52}_2
c    -b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_1
c    -b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨  b^{22, 52}_0
c  in DIMACS:
-14051 -14052  14053 -1122  14054 0
-14051 -14052  14053 -1122 -14055 0
-14051 -14052  14053 -1122  14056 0

c  -1+1 --> 0
c    ( b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0 ∧  p_1122) -> (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧ -b^{22, 52}_0)
c  in CNF:
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_2
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_1
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_0
c  in DIMACS:
-14051  14052 -14053 -1122 -14054 0
-14051  14052 -14053 -1122 -14055 0
-14051  14052 -14053 -1122 -14056 0

c  0+1 --> 1
c    (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧  p_1122) -> (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0)
c  in CNF:
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_2
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_1
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨  b^{22, 52}_0
c  in DIMACS:
 14051  14052  14053 -1122 -14054 0
 14051  14052  14053 -1122 -14055 0
 14051  14052  14053 -1122  14056 0

c  1+1 --> 2
c    (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0 ∧  p_1122) -> (-b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0)
c  in CNF:
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_2
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨  b^{22, 52}_1
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ -p_1122 ∨ -b^{22, 52}_0
c  in DIMACS:
 14051  14052 -14053 -1122 -14054 0
 14051  14052 -14053 -1122  14055 0
 14051  14052 -14053 -1122 -14056 0

c  2+1 --> break 
c    (-b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 14051 -14052  14053 -1122 1162 0


c  2-1 --> 1
c    (-b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧ -p_1122) -> (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0)
c  in CNF:
c     b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_2
c     b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_1
c     b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨  b^{22, 52}_0
c  in DIMACS:
 14051 -14052  14053  1122 -14054 0
 14051 -14052  14053  1122 -14055 0
 14051 -14052  14053  1122  14056 0

c  1-1 --> 0
c    (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0 ∧ -p_1122) -> (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧ -b^{22, 52}_0)
c  in CNF:
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_2
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_1
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_0
c  in DIMACS:
 14051  14052 -14053  1122 -14054 0
 14051  14052 -14053  1122 -14055 0
 14051  14052 -14053  1122 -14056 0

c  0-1 --> -1
c    (-b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧ -p_1122) -> ( b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0)
c  in CNF:
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨  b^{22, 52}_2
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_1
c     b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨  b^{22, 52}_0
c  in DIMACS:
 14051  14052  14053  1122  14054 0
 14051  14052  14053  1122 -14055 0
 14051  14052  14053  1122  14056 0

c  -1-1 --> -2
c    ( b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧  b^{22, 51}_0 ∧ -p_1122) -> ( b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0)
c  in CNF:
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨  b^{22, 52}_2
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨  b^{22, 52}_1
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨  p_1122 ∨ -b^{22, 52}_0
c  in DIMACS:
-14051  14052 -14053  1122  14054 0
-14051  14052 -14053  1122  14055 0
-14051  14052 -14053  1122 -14056 0

c  -2-1 --> break 
c    ( b^{22, 51}_2 ∧  b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨  b^{22, 51}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-14051 -14052  14053  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 51}_2 ∧ -b^{22, 51}_1 ∧ -b^{22, 51}_0 ∧ true) 
c  in CNF:
c    -b^{22, 51}_2 ∨  b^{22, 51}_1 ∨  b^{22, 51}_0 ∨ false 
c  in DIMACS:
-14051  14052  14053  0

c  3 does not represent an automaton state.
c    -(-b^{22, 51}_2 ∧  b^{22, 51}_1 ∧  b^{22, 51}_0 ∧ true) 
c  in CNF:
c     b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ false 
c  in DIMACS:
 14051 -14052 -14053  0
c  -3 does not represent an automaton state.
c    -( b^{22, 51}_2 ∧  b^{22, 51}_1 ∧  b^{22, 51}_0 ∧ true) 
c  in CNF:
c    -b^{22, 51}_2 ∨ -b^{22, 51}_1 ∨ -b^{22, 51}_0 ∨ false 
c  in DIMACS:
-14051 -14052 -14053  0

c i = 52
c  -2+1 --> -1
c    ( b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧  p_1144) -> ( b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧  b^{22, 53}_0)
c  in CNF:
c    -b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨  b^{22, 53}_2
c    -b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_1
c    -b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨  b^{22, 53}_0
c  in DIMACS:
-14054 -14055  14056 -1144  14057 0
-14054 -14055  14056 -1144 -14058 0
-14054 -14055  14056 -1144  14059 0

c  -1+1 --> 0
c    ( b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0 ∧  p_1144) -> (-b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧ -b^{22, 53}_0)
c  in CNF:
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_2
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_1
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_0
c  in DIMACS:
-14054  14055 -14056 -1144 -14057 0
-14054  14055 -14056 -1144 -14058 0
-14054  14055 -14056 -1144 -14059 0

c  0+1 --> 1
c    (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧  p_1144) -> (-b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧  b^{22, 53}_0)
c  in CNF:
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_2
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_1
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨  b^{22, 53}_0
c  in DIMACS:
 14054  14055  14056 -1144 -14057 0
 14054  14055  14056 -1144 -14058 0
 14054  14055  14056 -1144  14059 0

c  1+1 --> 2
c    (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0 ∧  p_1144) -> (-b^{22, 53}_2 ∧  b^{22, 53}_1 ∧ -b^{22, 53}_0)
c  in CNF:
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_2
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨  b^{22, 53}_1
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ -p_1144 ∨ -b^{22, 53}_0
c  in DIMACS:
 14054  14055 -14056 -1144 -14057 0
 14054  14055 -14056 -1144  14058 0
 14054  14055 -14056 -1144 -14059 0

c  2+1 --> break 
c    (-b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 14054 -14055  14056 -1144 1162 0


c  2-1 --> 1
c    (-b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧ -p_1144) -> (-b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧  b^{22, 53}_0)
c  in CNF:
c     b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_2
c     b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_1
c     b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨  b^{22, 53}_0
c  in DIMACS:
 14054 -14055  14056  1144 -14057 0
 14054 -14055  14056  1144 -14058 0
 14054 -14055  14056  1144  14059 0

c  1-1 --> 0
c    (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0 ∧ -p_1144) -> (-b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧ -b^{22, 53}_0)
c  in CNF:
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_2
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_1
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_0
c  in DIMACS:
 14054  14055 -14056  1144 -14057 0
 14054  14055 -14056  1144 -14058 0
 14054  14055 -14056  1144 -14059 0

c  0-1 --> -1
c    (-b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧ -p_1144) -> ( b^{22, 53}_2 ∧ -b^{22, 53}_1 ∧  b^{22, 53}_0)
c  in CNF:
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨  b^{22, 53}_2
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_1
c     b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨  b^{22, 53}_0
c  in DIMACS:
 14054  14055  14056  1144  14057 0
 14054  14055  14056  1144 -14058 0
 14054  14055  14056  1144  14059 0

c  -1-1 --> -2
c    ( b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧  b^{22, 52}_0 ∧ -p_1144) -> ( b^{22, 53}_2 ∧  b^{22, 53}_1 ∧ -b^{22, 53}_0)
c  in CNF:
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨  b^{22, 53}_2
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨  b^{22, 53}_1
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨  p_1144 ∨ -b^{22, 53}_0
c  in DIMACS:
-14054  14055 -14056  1144  14057 0
-14054  14055 -14056  1144  14058 0
-14054  14055 -14056  1144 -14059 0

c  -2-1 --> break 
c    ( b^{22, 52}_2 ∧  b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨  b^{22, 52}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-14054 -14055  14056  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{22, 52}_2 ∧ -b^{22, 52}_1 ∧ -b^{22, 52}_0 ∧ true) 
c  in CNF:
c    -b^{22, 52}_2 ∨  b^{22, 52}_1 ∨  b^{22, 52}_0 ∨ false 
c  in DIMACS:
-14054  14055  14056  0

c  3 does not represent an automaton state.
c    -(-b^{22, 52}_2 ∧  b^{22, 52}_1 ∧  b^{22, 52}_0 ∧ true) 
c  in CNF:
c     b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ false 
c  in DIMACS:
 14054 -14055 -14056  0
c  -3 does not represent an automaton state.
c    -( b^{22, 52}_2 ∧  b^{22, 52}_1 ∧  b^{22, 52}_0 ∧ true) 
c  in CNF:
c    -b^{22, 52}_2 ∨ -b^{22, 52}_1 ∨ -b^{22, 52}_0 ∨ false 
c  in DIMACS:
-14054 -14055 -14056  0

c INIT for k = 23
c    -b^{23, 1}_2
c    -b^{23, 1}_1
c    -b^{23, 1}_0
c  in DIMACS:
-14060 0
-14061 0
-14062 0

c Transitions for k = 23
c i = 1
c  -2+1 --> -1
c    ( b^{23, 1}_2 ∧  b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧  p_23) -> ( b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0)
c  in CNF:
c    -b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨  b^{23, 2}_2
c    -b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_1
c    -b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨  b^{23, 2}_0
c  in DIMACS:
-14060 -14061  14062 -23  14063 0
-14060 -14061  14062 -23 -14064 0
-14060 -14061  14062 -23  14065 0

c  -1+1 --> 0
c    ( b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧  b^{23, 1}_0 ∧  p_23) -> (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧ -b^{23, 2}_0)
c  in CNF:
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_2
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_1
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_0
c  in DIMACS:
-14060  14061 -14062 -23 -14063 0
-14060  14061 -14062 -23 -14064 0
-14060  14061 -14062 -23 -14065 0

c  0+1 --> 1
c    (-b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧  p_23) -> (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0)
c  in CNF:
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_2
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_1
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨  b^{23, 2}_0
c  in DIMACS:
 14060  14061  14062 -23 -14063 0
 14060  14061  14062 -23 -14064 0
 14060  14061  14062 -23  14065 0

c  1+1 --> 2
c    (-b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧  b^{23, 1}_0 ∧  p_23) -> (-b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0)
c  in CNF:
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_2
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨  b^{23, 2}_1
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ -p_23 ∨ -b^{23, 2}_0
c  in DIMACS:
 14060  14061 -14062 -23 -14063 0
 14060  14061 -14062 -23  14064 0
 14060  14061 -14062 -23 -14065 0

c  2+1 --> break 
c    (-b^{23, 1}_2 ∧  b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧  p_23) -> break
c  in CNF:
c     b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ -p_23 ∨ break
c  in DIMACS:
 14060 -14061  14062 -23 1162 0


c  2-1 --> 1
c    (-b^{23, 1}_2 ∧  b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧ -p_23) -> (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0)
c  in CNF:
c     b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_2
c     b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_1
c     b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨  b^{23, 2}_0
c  in DIMACS:
 14060 -14061  14062  23 -14063 0
 14060 -14061  14062  23 -14064 0
 14060 -14061  14062  23  14065 0

c  1-1 --> 0
c    (-b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧  b^{23, 1}_0 ∧ -p_23) -> (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧ -b^{23, 2}_0)
c  in CNF:
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_2
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_1
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_0
c  in DIMACS:
 14060  14061 -14062  23 -14063 0
 14060  14061 -14062  23 -14064 0
 14060  14061 -14062  23 -14065 0

c  0-1 --> -1
c    (-b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧ -p_23) -> ( b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0)
c  in CNF:
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨  b^{23, 2}_2
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_1
c     b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨  b^{23, 2}_0
c  in DIMACS:
 14060  14061  14062  23  14063 0
 14060  14061  14062  23 -14064 0
 14060  14061  14062  23  14065 0

c  -1-1 --> -2
c    ( b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧  b^{23, 1}_0 ∧ -p_23) -> ( b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0)
c  in CNF:
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨  b^{23, 2}_2
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨  b^{23, 2}_1
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨  p_23 ∨ -b^{23, 2}_0
c  in DIMACS:
-14060  14061 -14062  23  14063 0
-14060  14061 -14062  23  14064 0
-14060  14061 -14062  23 -14065 0

c  -2-1 --> break 
c    ( b^{23, 1}_2 ∧  b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧ -p_23) -> break
c  in CNF:
c    -b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨  b^{23, 1}_0 ∨  p_23 ∨ break
c  in DIMACS:
-14060 -14061  14062  23 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 1}_2 ∧ -b^{23, 1}_1 ∧ -b^{23, 1}_0 ∧ true) 
c  in CNF:
c    -b^{23, 1}_2 ∨  b^{23, 1}_1 ∨  b^{23, 1}_0 ∨ false 
c  in DIMACS:
-14060  14061  14062  0

c  3 does not represent an automaton state.
c    -(-b^{23, 1}_2 ∧  b^{23, 1}_1 ∧  b^{23, 1}_0 ∧ true) 
c  in CNF:
c     b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ false 
c  in DIMACS:
 14060 -14061 -14062  0
c  -3 does not represent an automaton state.
c    -( b^{23, 1}_2 ∧  b^{23, 1}_1 ∧  b^{23, 1}_0 ∧ true) 
c  in CNF:
c    -b^{23, 1}_2 ∨ -b^{23, 1}_1 ∨ -b^{23, 1}_0 ∨ false 
c  in DIMACS:
-14060 -14061 -14062  0

c i = 2
c  -2+1 --> -1
c    ( b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧  p_46) -> ( b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0)
c  in CNF:
c    -b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨  b^{23, 3}_2
c    -b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_1
c    -b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨  b^{23, 3}_0
c  in DIMACS:
-14063 -14064  14065 -46  14066 0
-14063 -14064  14065 -46 -14067 0
-14063 -14064  14065 -46  14068 0

c  -1+1 --> 0
c    ( b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0 ∧  p_46) -> (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧ -b^{23, 3}_0)
c  in CNF:
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_2
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_1
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_0
c  in DIMACS:
-14063  14064 -14065 -46 -14066 0
-14063  14064 -14065 -46 -14067 0
-14063  14064 -14065 -46 -14068 0

c  0+1 --> 1
c    (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧  p_46) -> (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0)
c  in CNF:
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_2
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_1
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨  b^{23, 3}_0
c  in DIMACS:
 14063  14064  14065 -46 -14066 0
 14063  14064  14065 -46 -14067 0
 14063  14064  14065 -46  14068 0

c  1+1 --> 2
c    (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0 ∧  p_46) -> (-b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0)
c  in CNF:
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_2
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨  b^{23, 3}_1
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ -p_46 ∨ -b^{23, 3}_0
c  in DIMACS:
 14063  14064 -14065 -46 -14066 0
 14063  14064 -14065 -46  14067 0
 14063  14064 -14065 -46 -14068 0

c  2+1 --> break 
c    (-b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧  p_46) -> break
c  in CNF:
c     b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ -p_46 ∨ break
c  in DIMACS:
 14063 -14064  14065 -46 1162 0


c  2-1 --> 1
c    (-b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧ -p_46) -> (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0)
c  in CNF:
c     b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_2
c     b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_1
c     b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨  b^{23, 3}_0
c  in DIMACS:
 14063 -14064  14065  46 -14066 0
 14063 -14064  14065  46 -14067 0
 14063 -14064  14065  46  14068 0

c  1-1 --> 0
c    (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0 ∧ -p_46) -> (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧ -b^{23, 3}_0)
c  in CNF:
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_2
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_1
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_0
c  in DIMACS:
 14063  14064 -14065  46 -14066 0
 14063  14064 -14065  46 -14067 0
 14063  14064 -14065  46 -14068 0

c  0-1 --> -1
c    (-b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧ -p_46) -> ( b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0)
c  in CNF:
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨  b^{23, 3}_2
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_1
c     b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨  b^{23, 3}_0
c  in DIMACS:
 14063  14064  14065  46  14066 0
 14063  14064  14065  46 -14067 0
 14063  14064  14065  46  14068 0

c  -1-1 --> -2
c    ( b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧  b^{23, 2}_0 ∧ -p_46) -> ( b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0)
c  in CNF:
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨  b^{23, 3}_2
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨  b^{23, 3}_1
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨  p_46 ∨ -b^{23, 3}_0
c  in DIMACS:
-14063  14064 -14065  46  14066 0
-14063  14064 -14065  46  14067 0
-14063  14064 -14065  46 -14068 0

c  -2-1 --> break 
c    ( b^{23, 2}_2 ∧  b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧ -p_46) -> break
c  in CNF:
c    -b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨  b^{23, 2}_0 ∨  p_46 ∨ break
c  in DIMACS:
-14063 -14064  14065  46 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 2}_2 ∧ -b^{23, 2}_1 ∧ -b^{23, 2}_0 ∧ true) 
c  in CNF:
c    -b^{23, 2}_2 ∨  b^{23, 2}_1 ∨  b^{23, 2}_0 ∨ false 
c  in DIMACS:
-14063  14064  14065  0

c  3 does not represent an automaton state.
c    -(-b^{23, 2}_2 ∧  b^{23, 2}_1 ∧  b^{23, 2}_0 ∧ true) 
c  in CNF:
c     b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ false 
c  in DIMACS:
 14063 -14064 -14065  0
c  -3 does not represent an automaton state.
c    -( b^{23, 2}_2 ∧  b^{23, 2}_1 ∧  b^{23, 2}_0 ∧ true) 
c  in CNF:
c    -b^{23, 2}_2 ∨ -b^{23, 2}_1 ∨ -b^{23, 2}_0 ∨ false 
c  in DIMACS:
-14063 -14064 -14065  0

c i = 3
c  -2+1 --> -1
c    ( b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧  p_69) -> ( b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0)
c  in CNF:
c    -b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨  b^{23, 4}_2
c    -b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_1
c    -b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨  b^{23, 4}_0
c  in DIMACS:
-14066 -14067  14068 -69  14069 0
-14066 -14067  14068 -69 -14070 0
-14066 -14067  14068 -69  14071 0

c  -1+1 --> 0
c    ( b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0 ∧  p_69) -> (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧ -b^{23, 4}_0)
c  in CNF:
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_2
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_1
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_0
c  in DIMACS:
-14066  14067 -14068 -69 -14069 0
-14066  14067 -14068 -69 -14070 0
-14066  14067 -14068 -69 -14071 0

c  0+1 --> 1
c    (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧  p_69) -> (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0)
c  in CNF:
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_2
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_1
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨  b^{23, 4}_0
c  in DIMACS:
 14066  14067  14068 -69 -14069 0
 14066  14067  14068 -69 -14070 0
 14066  14067  14068 -69  14071 0

c  1+1 --> 2
c    (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0 ∧  p_69) -> (-b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0)
c  in CNF:
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_2
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨  b^{23, 4}_1
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ -p_69 ∨ -b^{23, 4}_0
c  in DIMACS:
 14066  14067 -14068 -69 -14069 0
 14066  14067 -14068 -69  14070 0
 14066  14067 -14068 -69 -14071 0

c  2+1 --> break 
c    (-b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧  p_69) -> break
c  in CNF:
c     b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ -p_69 ∨ break
c  in DIMACS:
 14066 -14067  14068 -69 1162 0


c  2-1 --> 1
c    (-b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧ -p_69) -> (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0)
c  in CNF:
c     b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_2
c     b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_1
c     b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨  b^{23, 4}_0
c  in DIMACS:
 14066 -14067  14068  69 -14069 0
 14066 -14067  14068  69 -14070 0
 14066 -14067  14068  69  14071 0

c  1-1 --> 0
c    (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0 ∧ -p_69) -> (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧ -b^{23, 4}_0)
c  in CNF:
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_2
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_1
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_0
c  in DIMACS:
 14066  14067 -14068  69 -14069 0
 14066  14067 -14068  69 -14070 0
 14066  14067 -14068  69 -14071 0

c  0-1 --> -1
c    (-b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧ -p_69) -> ( b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0)
c  in CNF:
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨  b^{23, 4}_2
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_1
c     b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨  b^{23, 4}_0
c  in DIMACS:
 14066  14067  14068  69  14069 0
 14066  14067  14068  69 -14070 0
 14066  14067  14068  69  14071 0

c  -1-1 --> -2
c    ( b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧  b^{23, 3}_0 ∧ -p_69) -> ( b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0)
c  in CNF:
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨  b^{23, 4}_2
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨  b^{23, 4}_1
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨  p_69 ∨ -b^{23, 4}_0
c  in DIMACS:
-14066  14067 -14068  69  14069 0
-14066  14067 -14068  69  14070 0
-14066  14067 -14068  69 -14071 0

c  -2-1 --> break 
c    ( b^{23, 3}_2 ∧  b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧ -p_69) -> break
c  in CNF:
c    -b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨  b^{23, 3}_0 ∨  p_69 ∨ break
c  in DIMACS:
-14066 -14067  14068  69 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 3}_2 ∧ -b^{23, 3}_1 ∧ -b^{23, 3}_0 ∧ true) 
c  in CNF:
c    -b^{23, 3}_2 ∨  b^{23, 3}_1 ∨  b^{23, 3}_0 ∨ false 
c  in DIMACS:
-14066  14067  14068  0

c  3 does not represent an automaton state.
c    -(-b^{23, 3}_2 ∧  b^{23, 3}_1 ∧  b^{23, 3}_0 ∧ true) 
c  in CNF:
c     b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ false 
c  in DIMACS:
 14066 -14067 -14068  0
c  -3 does not represent an automaton state.
c    -( b^{23, 3}_2 ∧  b^{23, 3}_1 ∧  b^{23, 3}_0 ∧ true) 
c  in CNF:
c    -b^{23, 3}_2 ∨ -b^{23, 3}_1 ∨ -b^{23, 3}_0 ∨ false 
c  in DIMACS:
-14066 -14067 -14068  0

c i = 4
c  -2+1 --> -1
c    ( b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧  p_92) -> ( b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0)
c  in CNF:
c    -b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨  b^{23, 5}_2
c    -b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_1
c    -b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨  b^{23, 5}_0
c  in DIMACS:
-14069 -14070  14071 -92  14072 0
-14069 -14070  14071 -92 -14073 0
-14069 -14070  14071 -92  14074 0

c  -1+1 --> 0
c    ( b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0 ∧  p_92) -> (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧ -b^{23, 5}_0)
c  in CNF:
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_2
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_1
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_0
c  in DIMACS:
-14069  14070 -14071 -92 -14072 0
-14069  14070 -14071 -92 -14073 0
-14069  14070 -14071 -92 -14074 0

c  0+1 --> 1
c    (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧  p_92) -> (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0)
c  in CNF:
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_2
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_1
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨  b^{23, 5}_0
c  in DIMACS:
 14069  14070  14071 -92 -14072 0
 14069  14070  14071 -92 -14073 0
 14069  14070  14071 -92  14074 0

c  1+1 --> 2
c    (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0 ∧  p_92) -> (-b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0)
c  in CNF:
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_2
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨  b^{23, 5}_1
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ -p_92 ∨ -b^{23, 5}_0
c  in DIMACS:
 14069  14070 -14071 -92 -14072 0
 14069  14070 -14071 -92  14073 0
 14069  14070 -14071 -92 -14074 0

c  2+1 --> break 
c    (-b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧  p_92) -> break
c  in CNF:
c     b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 14069 -14070  14071 -92 1162 0


c  2-1 --> 1
c    (-b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧ -p_92) -> (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0)
c  in CNF:
c     b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_2
c     b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_1
c     b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨  b^{23, 5}_0
c  in DIMACS:
 14069 -14070  14071  92 -14072 0
 14069 -14070  14071  92 -14073 0
 14069 -14070  14071  92  14074 0

c  1-1 --> 0
c    (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0 ∧ -p_92) -> (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧ -b^{23, 5}_0)
c  in CNF:
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_2
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_1
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_0
c  in DIMACS:
 14069  14070 -14071  92 -14072 0
 14069  14070 -14071  92 -14073 0
 14069  14070 -14071  92 -14074 0

c  0-1 --> -1
c    (-b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧ -p_92) -> ( b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0)
c  in CNF:
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨  b^{23, 5}_2
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_1
c     b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨  b^{23, 5}_0
c  in DIMACS:
 14069  14070  14071  92  14072 0
 14069  14070  14071  92 -14073 0
 14069  14070  14071  92  14074 0

c  -1-1 --> -2
c    ( b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧  b^{23, 4}_0 ∧ -p_92) -> ( b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0)
c  in CNF:
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨  b^{23, 5}_2
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨  b^{23, 5}_1
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨  p_92 ∨ -b^{23, 5}_0
c  in DIMACS:
-14069  14070 -14071  92  14072 0
-14069  14070 -14071  92  14073 0
-14069  14070 -14071  92 -14074 0

c  -2-1 --> break 
c    ( b^{23, 4}_2 ∧  b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨  b^{23, 4}_0 ∨  p_92 ∨ break
c  in DIMACS:
-14069 -14070  14071  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 4}_2 ∧ -b^{23, 4}_1 ∧ -b^{23, 4}_0 ∧ true) 
c  in CNF:
c    -b^{23, 4}_2 ∨  b^{23, 4}_1 ∨  b^{23, 4}_0 ∨ false 
c  in DIMACS:
-14069  14070  14071  0

c  3 does not represent an automaton state.
c    -(-b^{23, 4}_2 ∧  b^{23, 4}_1 ∧  b^{23, 4}_0 ∧ true) 
c  in CNF:
c     b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ false 
c  in DIMACS:
 14069 -14070 -14071  0
c  -3 does not represent an automaton state.
c    -( b^{23, 4}_2 ∧  b^{23, 4}_1 ∧  b^{23, 4}_0 ∧ true) 
c  in CNF:
c    -b^{23, 4}_2 ∨ -b^{23, 4}_1 ∨ -b^{23, 4}_0 ∨ false 
c  in DIMACS:
-14069 -14070 -14071  0

c i = 5
c  -2+1 --> -1
c    ( b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧  p_115) -> ( b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0)
c  in CNF:
c    -b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨  b^{23, 6}_2
c    -b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_1
c    -b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨  b^{23, 6}_0
c  in DIMACS:
-14072 -14073  14074 -115  14075 0
-14072 -14073  14074 -115 -14076 0
-14072 -14073  14074 -115  14077 0

c  -1+1 --> 0
c    ( b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0 ∧  p_115) -> (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧ -b^{23, 6}_0)
c  in CNF:
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_2
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_1
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_0
c  in DIMACS:
-14072  14073 -14074 -115 -14075 0
-14072  14073 -14074 -115 -14076 0
-14072  14073 -14074 -115 -14077 0

c  0+1 --> 1
c    (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧  p_115) -> (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0)
c  in CNF:
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_2
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_1
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨  b^{23, 6}_0
c  in DIMACS:
 14072  14073  14074 -115 -14075 0
 14072  14073  14074 -115 -14076 0
 14072  14073  14074 -115  14077 0

c  1+1 --> 2
c    (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0 ∧  p_115) -> (-b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0)
c  in CNF:
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_2
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨  b^{23, 6}_1
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ -p_115 ∨ -b^{23, 6}_0
c  in DIMACS:
 14072  14073 -14074 -115 -14075 0
 14072  14073 -14074 -115  14076 0
 14072  14073 -14074 -115 -14077 0

c  2+1 --> break 
c    (-b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧  p_115) -> break
c  in CNF:
c     b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ -p_115 ∨ break
c  in DIMACS:
 14072 -14073  14074 -115 1162 0


c  2-1 --> 1
c    (-b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧ -p_115) -> (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0)
c  in CNF:
c     b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_2
c     b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_1
c     b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨  b^{23, 6}_0
c  in DIMACS:
 14072 -14073  14074  115 -14075 0
 14072 -14073  14074  115 -14076 0
 14072 -14073  14074  115  14077 0

c  1-1 --> 0
c    (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0 ∧ -p_115) -> (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧ -b^{23, 6}_0)
c  in CNF:
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_2
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_1
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_0
c  in DIMACS:
 14072  14073 -14074  115 -14075 0
 14072  14073 -14074  115 -14076 0
 14072  14073 -14074  115 -14077 0

c  0-1 --> -1
c    (-b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧ -p_115) -> ( b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0)
c  in CNF:
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨  b^{23, 6}_2
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_1
c     b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨  b^{23, 6}_0
c  in DIMACS:
 14072  14073  14074  115  14075 0
 14072  14073  14074  115 -14076 0
 14072  14073  14074  115  14077 0

c  -1-1 --> -2
c    ( b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧  b^{23, 5}_0 ∧ -p_115) -> ( b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0)
c  in CNF:
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨  b^{23, 6}_2
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨  b^{23, 6}_1
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨  p_115 ∨ -b^{23, 6}_0
c  in DIMACS:
-14072  14073 -14074  115  14075 0
-14072  14073 -14074  115  14076 0
-14072  14073 -14074  115 -14077 0

c  -2-1 --> break 
c    ( b^{23, 5}_2 ∧  b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧ -p_115) -> break
c  in CNF:
c    -b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨  b^{23, 5}_0 ∨  p_115 ∨ break
c  in DIMACS:
-14072 -14073  14074  115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 5}_2 ∧ -b^{23, 5}_1 ∧ -b^{23, 5}_0 ∧ true) 
c  in CNF:
c    -b^{23, 5}_2 ∨  b^{23, 5}_1 ∨  b^{23, 5}_0 ∨ false 
c  in DIMACS:
-14072  14073  14074  0

c  3 does not represent an automaton state.
c    -(-b^{23, 5}_2 ∧  b^{23, 5}_1 ∧  b^{23, 5}_0 ∧ true) 
c  in CNF:
c     b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ false 
c  in DIMACS:
 14072 -14073 -14074  0
c  -3 does not represent an automaton state.
c    -( b^{23, 5}_2 ∧  b^{23, 5}_1 ∧  b^{23, 5}_0 ∧ true) 
c  in CNF:
c    -b^{23, 5}_2 ∨ -b^{23, 5}_1 ∨ -b^{23, 5}_0 ∨ false 
c  in DIMACS:
-14072 -14073 -14074  0

c i = 6
c  -2+1 --> -1
c    ( b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧  p_138) -> ( b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0)
c  in CNF:
c    -b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨  b^{23, 7}_2
c    -b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_1
c    -b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨  b^{23, 7}_0
c  in DIMACS:
-14075 -14076  14077 -138  14078 0
-14075 -14076  14077 -138 -14079 0
-14075 -14076  14077 -138  14080 0

c  -1+1 --> 0
c    ( b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0 ∧  p_138) -> (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧ -b^{23, 7}_0)
c  in CNF:
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_2
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_1
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_0
c  in DIMACS:
-14075  14076 -14077 -138 -14078 0
-14075  14076 -14077 -138 -14079 0
-14075  14076 -14077 -138 -14080 0

c  0+1 --> 1
c    (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧  p_138) -> (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0)
c  in CNF:
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_2
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_1
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨  b^{23, 7}_0
c  in DIMACS:
 14075  14076  14077 -138 -14078 0
 14075  14076  14077 -138 -14079 0
 14075  14076  14077 -138  14080 0

c  1+1 --> 2
c    (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0 ∧  p_138) -> (-b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0)
c  in CNF:
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_2
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨  b^{23, 7}_1
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ -p_138 ∨ -b^{23, 7}_0
c  in DIMACS:
 14075  14076 -14077 -138 -14078 0
 14075  14076 -14077 -138  14079 0
 14075  14076 -14077 -138 -14080 0

c  2+1 --> break 
c    (-b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧  p_138) -> break
c  in CNF:
c     b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 14075 -14076  14077 -138 1162 0


c  2-1 --> 1
c    (-b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧ -p_138) -> (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0)
c  in CNF:
c     b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_2
c     b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_1
c     b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨  b^{23, 7}_0
c  in DIMACS:
 14075 -14076  14077  138 -14078 0
 14075 -14076  14077  138 -14079 0
 14075 -14076  14077  138  14080 0

c  1-1 --> 0
c    (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0 ∧ -p_138) -> (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧ -b^{23, 7}_0)
c  in CNF:
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_2
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_1
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_0
c  in DIMACS:
 14075  14076 -14077  138 -14078 0
 14075  14076 -14077  138 -14079 0
 14075  14076 -14077  138 -14080 0

c  0-1 --> -1
c    (-b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧ -p_138) -> ( b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0)
c  in CNF:
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨  b^{23, 7}_2
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_1
c     b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨  b^{23, 7}_0
c  in DIMACS:
 14075  14076  14077  138  14078 0
 14075  14076  14077  138 -14079 0
 14075  14076  14077  138  14080 0

c  -1-1 --> -2
c    ( b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧  b^{23, 6}_0 ∧ -p_138) -> ( b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0)
c  in CNF:
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨  b^{23, 7}_2
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨  b^{23, 7}_1
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨  p_138 ∨ -b^{23, 7}_0
c  in DIMACS:
-14075  14076 -14077  138  14078 0
-14075  14076 -14077  138  14079 0
-14075  14076 -14077  138 -14080 0

c  -2-1 --> break 
c    ( b^{23, 6}_2 ∧  b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨  b^{23, 6}_0 ∨  p_138 ∨ break
c  in DIMACS:
-14075 -14076  14077  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 6}_2 ∧ -b^{23, 6}_1 ∧ -b^{23, 6}_0 ∧ true) 
c  in CNF:
c    -b^{23, 6}_2 ∨  b^{23, 6}_1 ∨  b^{23, 6}_0 ∨ false 
c  in DIMACS:
-14075  14076  14077  0

c  3 does not represent an automaton state.
c    -(-b^{23, 6}_2 ∧  b^{23, 6}_1 ∧  b^{23, 6}_0 ∧ true) 
c  in CNF:
c     b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ false 
c  in DIMACS:
 14075 -14076 -14077  0
c  -3 does not represent an automaton state.
c    -( b^{23, 6}_2 ∧  b^{23, 6}_1 ∧  b^{23, 6}_0 ∧ true) 
c  in CNF:
c    -b^{23, 6}_2 ∨ -b^{23, 6}_1 ∨ -b^{23, 6}_0 ∨ false 
c  in DIMACS:
-14075 -14076 -14077  0

c i = 7
c  -2+1 --> -1
c    ( b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧  p_161) -> ( b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0)
c  in CNF:
c    -b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨  b^{23, 8}_2
c    -b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_1
c    -b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨  b^{23, 8}_0
c  in DIMACS:
-14078 -14079  14080 -161  14081 0
-14078 -14079  14080 -161 -14082 0
-14078 -14079  14080 -161  14083 0

c  -1+1 --> 0
c    ( b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0 ∧  p_161) -> (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧ -b^{23, 8}_0)
c  in CNF:
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_2
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_1
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_0
c  in DIMACS:
-14078  14079 -14080 -161 -14081 0
-14078  14079 -14080 -161 -14082 0
-14078  14079 -14080 -161 -14083 0

c  0+1 --> 1
c    (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧  p_161) -> (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0)
c  in CNF:
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_2
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_1
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨  b^{23, 8}_0
c  in DIMACS:
 14078  14079  14080 -161 -14081 0
 14078  14079  14080 -161 -14082 0
 14078  14079  14080 -161  14083 0

c  1+1 --> 2
c    (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0 ∧  p_161) -> (-b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0)
c  in CNF:
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_2
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨  b^{23, 8}_1
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ -p_161 ∨ -b^{23, 8}_0
c  in DIMACS:
 14078  14079 -14080 -161 -14081 0
 14078  14079 -14080 -161  14082 0
 14078  14079 -14080 -161 -14083 0

c  2+1 --> break 
c    (-b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧  p_161) -> break
c  in CNF:
c     b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ -p_161 ∨ break
c  in DIMACS:
 14078 -14079  14080 -161 1162 0


c  2-1 --> 1
c    (-b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧ -p_161) -> (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0)
c  in CNF:
c     b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_2
c     b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_1
c     b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨  b^{23, 8}_0
c  in DIMACS:
 14078 -14079  14080  161 -14081 0
 14078 -14079  14080  161 -14082 0
 14078 -14079  14080  161  14083 0

c  1-1 --> 0
c    (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0 ∧ -p_161) -> (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧ -b^{23, 8}_0)
c  in CNF:
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_2
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_1
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_0
c  in DIMACS:
 14078  14079 -14080  161 -14081 0
 14078  14079 -14080  161 -14082 0
 14078  14079 -14080  161 -14083 0

c  0-1 --> -1
c    (-b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧ -p_161) -> ( b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0)
c  in CNF:
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨  b^{23, 8}_2
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_1
c     b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨  b^{23, 8}_0
c  in DIMACS:
 14078  14079  14080  161  14081 0
 14078  14079  14080  161 -14082 0
 14078  14079  14080  161  14083 0

c  -1-1 --> -2
c    ( b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧  b^{23, 7}_0 ∧ -p_161) -> ( b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0)
c  in CNF:
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨  b^{23, 8}_2
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨  b^{23, 8}_1
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨  p_161 ∨ -b^{23, 8}_0
c  in DIMACS:
-14078  14079 -14080  161  14081 0
-14078  14079 -14080  161  14082 0
-14078  14079 -14080  161 -14083 0

c  -2-1 --> break 
c    ( b^{23, 7}_2 ∧  b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧ -p_161) -> break
c  in CNF:
c    -b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨  b^{23, 7}_0 ∨  p_161 ∨ break
c  in DIMACS:
-14078 -14079  14080  161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 7}_2 ∧ -b^{23, 7}_1 ∧ -b^{23, 7}_0 ∧ true) 
c  in CNF:
c    -b^{23, 7}_2 ∨  b^{23, 7}_1 ∨  b^{23, 7}_0 ∨ false 
c  in DIMACS:
-14078  14079  14080  0

c  3 does not represent an automaton state.
c    -(-b^{23, 7}_2 ∧  b^{23, 7}_1 ∧  b^{23, 7}_0 ∧ true) 
c  in CNF:
c     b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ false 
c  in DIMACS:
 14078 -14079 -14080  0
c  -3 does not represent an automaton state.
c    -( b^{23, 7}_2 ∧  b^{23, 7}_1 ∧  b^{23, 7}_0 ∧ true) 
c  in CNF:
c    -b^{23, 7}_2 ∨ -b^{23, 7}_1 ∨ -b^{23, 7}_0 ∨ false 
c  in DIMACS:
-14078 -14079 -14080  0

c i = 8
c  -2+1 --> -1
c    ( b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧  p_184) -> ( b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0)
c  in CNF:
c    -b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨  b^{23, 9}_2
c    -b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_1
c    -b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨  b^{23, 9}_0
c  in DIMACS:
-14081 -14082  14083 -184  14084 0
-14081 -14082  14083 -184 -14085 0
-14081 -14082  14083 -184  14086 0

c  -1+1 --> 0
c    ( b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0 ∧  p_184) -> (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧ -b^{23, 9}_0)
c  in CNF:
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_2
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_1
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_0
c  in DIMACS:
-14081  14082 -14083 -184 -14084 0
-14081  14082 -14083 -184 -14085 0
-14081  14082 -14083 -184 -14086 0

c  0+1 --> 1
c    (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧  p_184) -> (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0)
c  in CNF:
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_2
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_1
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨  b^{23, 9}_0
c  in DIMACS:
 14081  14082  14083 -184 -14084 0
 14081  14082  14083 -184 -14085 0
 14081  14082  14083 -184  14086 0

c  1+1 --> 2
c    (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0 ∧  p_184) -> (-b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0)
c  in CNF:
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_2
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨  b^{23, 9}_1
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ -p_184 ∨ -b^{23, 9}_0
c  in DIMACS:
 14081  14082 -14083 -184 -14084 0
 14081  14082 -14083 -184  14085 0
 14081  14082 -14083 -184 -14086 0

c  2+1 --> break 
c    (-b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧  p_184) -> break
c  in CNF:
c     b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 14081 -14082  14083 -184 1162 0


c  2-1 --> 1
c    (-b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧ -p_184) -> (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0)
c  in CNF:
c     b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_2
c     b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_1
c     b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨  b^{23, 9}_0
c  in DIMACS:
 14081 -14082  14083  184 -14084 0
 14081 -14082  14083  184 -14085 0
 14081 -14082  14083  184  14086 0

c  1-1 --> 0
c    (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0 ∧ -p_184) -> (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧ -b^{23, 9}_0)
c  in CNF:
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_2
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_1
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_0
c  in DIMACS:
 14081  14082 -14083  184 -14084 0
 14081  14082 -14083  184 -14085 0
 14081  14082 -14083  184 -14086 0

c  0-1 --> -1
c    (-b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧ -p_184) -> ( b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0)
c  in CNF:
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨  b^{23, 9}_2
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_1
c     b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨  b^{23, 9}_0
c  in DIMACS:
 14081  14082  14083  184  14084 0
 14081  14082  14083  184 -14085 0
 14081  14082  14083  184  14086 0

c  -1-1 --> -2
c    ( b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧  b^{23, 8}_0 ∧ -p_184) -> ( b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0)
c  in CNF:
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨  b^{23, 9}_2
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨  b^{23, 9}_1
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨  p_184 ∨ -b^{23, 9}_0
c  in DIMACS:
-14081  14082 -14083  184  14084 0
-14081  14082 -14083  184  14085 0
-14081  14082 -14083  184 -14086 0

c  -2-1 --> break 
c    ( b^{23, 8}_2 ∧  b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨  b^{23, 8}_0 ∨  p_184 ∨ break
c  in DIMACS:
-14081 -14082  14083  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 8}_2 ∧ -b^{23, 8}_1 ∧ -b^{23, 8}_0 ∧ true) 
c  in CNF:
c    -b^{23, 8}_2 ∨  b^{23, 8}_1 ∨  b^{23, 8}_0 ∨ false 
c  in DIMACS:
-14081  14082  14083  0

c  3 does not represent an automaton state.
c    -(-b^{23, 8}_2 ∧  b^{23, 8}_1 ∧  b^{23, 8}_0 ∧ true) 
c  in CNF:
c     b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ false 
c  in DIMACS:
 14081 -14082 -14083  0
c  -3 does not represent an automaton state.
c    -( b^{23, 8}_2 ∧  b^{23, 8}_1 ∧  b^{23, 8}_0 ∧ true) 
c  in CNF:
c    -b^{23, 8}_2 ∨ -b^{23, 8}_1 ∨ -b^{23, 8}_0 ∨ false 
c  in DIMACS:
-14081 -14082 -14083  0

c i = 9
c  -2+1 --> -1
c    ( b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧  p_207) -> ( b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0)
c  in CNF:
c    -b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨  b^{23, 10}_2
c    -b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_1
c    -b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨  b^{23, 10}_0
c  in DIMACS:
-14084 -14085  14086 -207  14087 0
-14084 -14085  14086 -207 -14088 0
-14084 -14085  14086 -207  14089 0

c  -1+1 --> 0
c    ( b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0 ∧  p_207) -> (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧ -b^{23, 10}_0)
c  in CNF:
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_2
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_1
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_0
c  in DIMACS:
-14084  14085 -14086 -207 -14087 0
-14084  14085 -14086 -207 -14088 0
-14084  14085 -14086 -207 -14089 0

c  0+1 --> 1
c    (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧  p_207) -> (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0)
c  in CNF:
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_2
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_1
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨  b^{23, 10}_0
c  in DIMACS:
 14084  14085  14086 -207 -14087 0
 14084  14085  14086 -207 -14088 0
 14084  14085  14086 -207  14089 0

c  1+1 --> 2
c    (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0 ∧  p_207) -> (-b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0)
c  in CNF:
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_2
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨  b^{23, 10}_1
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ -p_207 ∨ -b^{23, 10}_0
c  in DIMACS:
 14084  14085 -14086 -207 -14087 0
 14084  14085 -14086 -207  14088 0
 14084  14085 -14086 -207 -14089 0

c  2+1 --> break 
c    (-b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧  p_207) -> break
c  in CNF:
c     b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 14084 -14085  14086 -207 1162 0


c  2-1 --> 1
c    (-b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧ -p_207) -> (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0)
c  in CNF:
c     b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_2
c     b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_1
c     b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨  b^{23, 10}_0
c  in DIMACS:
 14084 -14085  14086  207 -14087 0
 14084 -14085  14086  207 -14088 0
 14084 -14085  14086  207  14089 0

c  1-1 --> 0
c    (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0 ∧ -p_207) -> (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧ -b^{23, 10}_0)
c  in CNF:
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_2
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_1
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_0
c  in DIMACS:
 14084  14085 -14086  207 -14087 0
 14084  14085 -14086  207 -14088 0
 14084  14085 -14086  207 -14089 0

c  0-1 --> -1
c    (-b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧ -p_207) -> ( b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0)
c  in CNF:
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨  b^{23, 10}_2
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_1
c     b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨  b^{23, 10}_0
c  in DIMACS:
 14084  14085  14086  207  14087 0
 14084  14085  14086  207 -14088 0
 14084  14085  14086  207  14089 0

c  -1-1 --> -2
c    ( b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧  b^{23, 9}_0 ∧ -p_207) -> ( b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0)
c  in CNF:
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨  b^{23, 10}_2
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨  b^{23, 10}_1
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨  p_207 ∨ -b^{23, 10}_0
c  in DIMACS:
-14084  14085 -14086  207  14087 0
-14084  14085 -14086  207  14088 0
-14084  14085 -14086  207 -14089 0

c  -2-1 --> break 
c    ( b^{23, 9}_2 ∧  b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨  b^{23, 9}_0 ∨  p_207 ∨ break
c  in DIMACS:
-14084 -14085  14086  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 9}_2 ∧ -b^{23, 9}_1 ∧ -b^{23, 9}_0 ∧ true) 
c  in CNF:
c    -b^{23, 9}_2 ∨  b^{23, 9}_1 ∨  b^{23, 9}_0 ∨ false 
c  in DIMACS:
-14084  14085  14086  0

c  3 does not represent an automaton state.
c    -(-b^{23, 9}_2 ∧  b^{23, 9}_1 ∧  b^{23, 9}_0 ∧ true) 
c  in CNF:
c     b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ false 
c  in DIMACS:
 14084 -14085 -14086  0
c  -3 does not represent an automaton state.
c    -( b^{23, 9}_2 ∧  b^{23, 9}_1 ∧  b^{23, 9}_0 ∧ true) 
c  in CNF:
c    -b^{23, 9}_2 ∨ -b^{23, 9}_1 ∨ -b^{23, 9}_0 ∨ false 
c  in DIMACS:
-14084 -14085 -14086  0

c i = 10
c  -2+1 --> -1
c    ( b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧  p_230) -> ( b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0)
c  in CNF:
c    -b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨  b^{23, 11}_2
c    -b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_1
c    -b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨  b^{23, 11}_0
c  in DIMACS:
-14087 -14088  14089 -230  14090 0
-14087 -14088  14089 -230 -14091 0
-14087 -14088  14089 -230  14092 0

c  -1+1 --> 0
c    ( b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0 ∧  p_230) -> (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧ -b^{23, 11}_0)
c  in CNF:
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_2
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_1
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_0
c  in DIMACS:
-14087  14088 -14089 -230 -14090 0
-14087  14088 -14089 -230 -14091 0
-14087  14088 -14089 -230 -14092 0

c  0+1 --> 1
c    (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧  p_230) -> (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0)
c  in CNF:
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_2
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_1
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨  b^{23, 11}_0
c  in DIMACS:
 14087  14088  14089 -230 -14090 0
 14087  14088  14089 -230 -14091 0
 14087  14088  14089 -230  14092 0

c  1+1 --> 2
c    (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0 ∧  p_230) -> (-b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0)
c  in CNF:
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_2
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨  b^{23, 11}_1
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ -p_230 ∨ -b^{23, 11}_0
c  in DIMACS:
 14087  14088 -14089 -230 -14090 0
 14087  14088 -14089 -230  14091 0
 14087  14088 -14089 -230 -14092 0

c  2+1 --> break 
c    (-b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧  p_230) -> break
c  in CNF:
c     b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 14087 -14088  14089 -230 1162 0


c  2-1 --> 1
c    (-b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧ -p_230) -> (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0)
c  in CNF:
c     b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_2
c     b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_1
c     b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨  b^{23, 11}_0
c  in DIMACS:
 14087 -14088  14089  230 -14090 0
 14087 -14088  14089  230 -14091 0
 14087 -14088  14089  230  14092 0

c  1-1 --> 0
c    (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0 ∧ -p_230) -> (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧ -b^{23, 11}_0)
c  in CNF:
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_2
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_1
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_0
c  in DIMACS:
 14087  14088 -14089  230 -14090 0
 14087  14088 -14089  230 -14091 0
 14087  14088 -14089  230 -14092 0

c  0-1 --> -1
c    (-b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧ -p_230) -> ( b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0)
c  in CNF:
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨  b^{23, 11}_2
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_1
c     b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨  b^{23, 11}_0
c  in DIMACS:
 14087  14088  14089  230  14090 0
 14087  14088  14089  230 -14091 0
 14087  14088  14089  230  14092 0

c  -1-1 --> -2
c    ( b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧  b^{23, 10}_0 ∧ -p_230) -> ( b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0)
c  in CNF:
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨  b^{23, 11}_2
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨  b^{23, 11}_1
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨  p_230 ∨ -b^{23, 11}_0
c  in DIMACS:
-14087  14088 -14089  230  14090 0
-14087  14088 -14089  230  14091 0
-14087  14088 -14089  230 -14092 0

c  -2-1 --> break 
c    ( b^{23, 10}_2 ∧  b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨  b^{23, 10}_0 ∨  p_230 ∨ break
c  in DIMACS:
-14087 -14088  14089  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 10}_2 ∧ -b^{23, 10}_1 ∧ -b^{23, 10}_0 ∧ true) 
c  in CNF:
c    -b^{23, 10}_2 ∨  b^{23, 10}_1 ∨  b^{23, 10}_0 ∨ false 
c  in DIMACS:
-14087  14088  14089  0

c  3 does not represent an automaton state.
c    -(-b^{23, 10}_2 ∧  b^{23, 10}_1 ∧  b^{23, 10}_0 ∧ true) 
c  in CNF:
c     b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ false 
c  in DIMACS:
 14087 -14088 -14089  0
c  -3 does not represent an automaton state.
c    -( b^{23, 10}_2 ∧  b^{23, 10}_1 ∧  b^{23, 10}_0 ∧ true) 
c  in CNF:
c    -b^{23, 10}_2 ∨ -b^{23, 10}_1 ∨ -b^{23, 10}_0 ∨ false 
c  in DIMACS:
-14087 -14088 -14089  0

c i = 11
c  -2+1 --> -1
c    ( b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧  p_253) -> ( b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0)
c  in CNF:
c    -b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨  b^{23, 12}_2
c    -b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_1
c    -b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨  b^{23, 12}_0
c  in DIMACS:
-14090 -14091  14092 -253  14093 0
-14090 -14091  14092 -253 -14094 0
-14090 -14091  14092 -253  14095 0

c  -1+1 --> 0
c    ( b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0 ∧  p_253) -> (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧ -b^{23, 12}_0)
c  in CNF:
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_2
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_1
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_0
c  in DIMACS:
-14090  14091 -14092 -253 -14093 0
-14090  14091 -14092 -253 -14094 0
-14090  14091 -14092 -253 -14095 0

c  0+1 --> 1
c    (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧  p_253) -> (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0)
c  in CNF:
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_2
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_1
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨  b^{23, 12}_0
c  in DIMACS:
 14090  14091  14092 -253 -14093 0
 14090  14091  14092 -253 -14094 0
 14090  14091  14092 -253  14095 0

c  1+1 --> 2
c    (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0 ∧  p_253) -> (-b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0)
c  in CNF:
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_2
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨  b^{23, 12}_1
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ -p_253 ∨ -b^{23, 12}_0
c  in DIMACS:
 14090  14091 -14092 -253 -14093 0
 14090  14091 -14092 -253  14094 0
 14090  14091 -14092 -253 -14095 0

c  2+1 --> break 
c    (-b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧  p_253) -> break
c  in CNF:
c     b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ -p_253 ∨ break
c  in DIMACS:
 14090 -14091  14092 -253 1162 0


c  2-1 --> 1
c    (-b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧ -p_253) -> (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0)
c  in CNF:
c     b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_2
c     b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_1
c     b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨  b^{23, 12}_0
c  in DIMACS:
 14090 -14091  14092  253 -14093 0
 14090 -14091  14092  253 -14094 0
 14090 -14091  14092  253  14095 0

c  1-1 --> 0
c    (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0 ∧ -p_253) -> (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧ -b^{23, 12}_0)
c  in CNF:
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_2
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_1
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_0
c  in DIMACS:
 14090  14091 -14092  253 -14093 0
 14090  14091 -14092  253 -14094 0
 14090  14091 -14092  253 -14095 0

c  0-1 --> -1
c    (-b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧ -p_253) -> ( b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0)
c  in CNF:
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨  b^{23, 12}_2
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_1
c     b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨  b^{23, 12}_0
c  in DIMACS:
 14090  14091  14092  253  14093 0
 14090  14091  14092  253 -14094 0
 14090  14091  14092  253  14095 0

c  -1-1 --> -2
c    ( b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧  b^{23, 11}_0 ∧ -p_253) -> ( b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0)
c  in CNF:
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨  b^{23, 12}_2
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨  b^{23, 12}_1
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨  p_253 ∨ -b^{23, 12}_0
c  in DIMACS:
-14090  14091 -14092  253  14093 0
-14090  14091 -14092  253  14094 0
-14090  14091 -14092  253 -14095 0

c  -2-1 --> break 
c    ( b^{23, 11}_2 ∧  b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧ -p_253) -> break
c  in CNF:
c    -b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨  b^{23, 11}_0 ∨  p_253 ∨ break
c  in DIMACS:
-14090 -14091  14092  253 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 11}_2 ∧ -b^{23, 11}_1 ∧ -b^{23, 11}_0 ∧ true) 
c  in CNF:
c    -b^{23, 11}_2 ∨  b^{23, 11}_1 ∨  b^{23, 11}_0 ∨ false 
c  in DIMACS:
-14090  14091  14092  0

c  3 does not represent an automaton state.
c    -(-b^{23, 11}_2 ∧  b^{23, 11}_1 ∧  b^{23, 11}_0 ∧ true) 
c  in CNF:
c     b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ false 
c  in DIMACS:
 14090 -14091 -14092  0
c  -3 does not represent an automaton state.
c    -( b^{23, 11}_2 ∧  b^{23, 11}_1 ∧  b^{23, 11}_0 ∧ true) 
c  in CNF:
c    -b^{23, 11}_2 ∨ -b^{23, 11}_1 ∨ -b^{23, 11}_0 ∨ false 
c  in DIMACS:
-14090 -14091 -14092  0

c i = 12
c  -2+1 --> -1
c    ( b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧  p_276) -> ( b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0)
c  in CNF:
c    -b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨  b^{23, 13}_2
c    -b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_1
c    -b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨  b^{23, 13}_0
c  in DIMACS:
-14093 -14094  14095 -276  14096 0
-14093 -14094  14095 -276 -14097 0
-14093 -14094  14095 -276  14098 0

c  -1+1 --> 0
c    ( b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0 ∧  p_276) -> (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧ -b^{23, 13}_0)
c  in CNF:
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_2
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_1
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_0
c  in DIMACS:
-14093  14094 -14095 -276 -14096 0
-14093  14094 -14095 -276 -14097 0
-14093  14094 -14095 -276 -14098 0

c  0+1 --> 1
c    (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧  p_276) -> (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0)
c  in CNF:
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_2
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_1
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨  b^{23, 13}_0
c  in DIMACS:
 14093  14094  14095 -276 -14096 0
 14093  14094  14095 -276 -14097 0
 14093  14094  14095 -276  14098 0

c  1+1 --> 2
c    (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0 ∧  p_276) -> (-b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0)
c  in CNF:
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_2
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨  b^{23, 13}_1
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ -p_276 ∨ -b^{23, 13}_0
c  in DIMACS:
 14093  14094 -14095 -276 -14096 0
 14093  14094 -14095 -276  14097 0
 14093  14094 -14095 -276 -14098 0

c  2+1 --> break 
c    (-b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧  p_276) -> break
c  in CNF:
c     b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 14093 -14094  14095 -276 1162 0


c  2-1 --> 1
c    (-b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧ -p_276) -> (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0)
c  in CNF:
c     b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_2
c     b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_1
c     b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨  b^{23, 13}_0
c  in DIMACS:
 14093 -14094  14095  276 -14096 0
 14093 -14094  14095  276 -14097 0
 14093 -14094  14095  276  14098 0

c  1-1 --> 0
c    (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0 ∧ -p_276) -> (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧ -b^{23, 13}_0)
c  in CNF:
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_2
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_1
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_0
c  in DIMACS:
 14093  14094 -14095  276 -14096 0
 14093  14094 -14095  276 -14097 0
 14093  14094 -14095  276 -14098 0

c  0-1 --> -1
c    (-b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧ -p_276) -> ( b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0)
c  in CNF:
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨  b^{23, 13}_2
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_1
c     b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨  b^{23, 13}_0
c  in DIMACS:
 14093  14094  14095  276  14096 0
 14093  14094  14095  276 -14097 0
 14093  14094  14095  276  14098 0

c  -1-1 --> -2
c    ( b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧  b^{23, 12}_0 ∧ -p_276) -> ( b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0)
c  in CNF:
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨  b^{23, 13}_2
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨  b^{23, 13}_1
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨  p_276 ∨ -b^{23, 13}_0
c  in DIMACS:
-14093  14094 -14095  276  14096 0
-14093  14094 -14095  276  14097 0
-14093  14094 -14095  276 -14098 0

c  -2-1 --> break 
c    ( b^{23, 12}_2 ∧  b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨  b^{23, 12}_0 ∨  p_276 ∨ break
c  in DIMACS:
-14093 -14094  14095  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 12}_2 ∧ -b^{23, 12}_1 ∧ -b^{23, 12}_0 ∧ true) 
c  in CNF:
c    -b^{23, 12}_2 ∨  b^{23, 12}_1 ∨  b^{23, 12}_0 ∨ false 
c  in DIMACS:
-14093  14094  14095  0

c  3 does not represent an automaton state.
c    -(-b^{23, 12}_2 ∧  b^{23, 12}_1 ∧  b^{23, 12}_0 ∧ true) 
c  in CNF:
c     b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ false 
c  in DIMACS:
 14093 -14094 -14095  0
c  -3 does not represent an automaton state.
c    -( b^{23, 12}_2 ∧  b^{23, 12}_1 ∧  b^{23, 12}_0 ∧ true) 
c  in CNF:
c    -b^{23, 12}_2 ∨ -b^{23, 12}_1 ∨ -b^{23, 12}_0 ∨ false 
c  in DIMACS:
-14093 -14094 -14095  0

c i = 13
c  -2+1 --> -1
c    ( b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧  p_299) -> ( b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0)
c  in CNF:
c    -b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨  b^{23, 14}_2
c    -b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_1
c    -b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨  b^{23, 14}_0
c  in DIMACS:
-14096 -14097  14098 -299  14099 0
-14096 -14097  14098 -299 -14100 0
-14096 -14097  14098 -299  14101 0

c  -1+1 --> 0
c    ( b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0 ∧  p_299) -> (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧ -b^{23, 14}_0)
c  in CNF:
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_2
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_1
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_0
c  in DIMACS:
-14096  14097 -14098 -299 -14099 0
-14096  14097 -14098 -299 -14100 0
-14096  14097 -14098 -299 -14101 0

c  0+1 --> 1
c    (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧  p_299) -> (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0)
c  in CNF:
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_2
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_1
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨  b^{23, 14}_0
c  in DIMACS:
 14096  14097  14098 -299 -14099 0
 14096  14097  14098 -299 -14100 0
 14096  14097  14098 -299  14101 0

c  1+1 --> 2
c    (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0 ∧  p_299) -> (-b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0)
c  in CNF:
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_2
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨  b^{23, 14}_1
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ -p_299 ∨ -b^{23, 14}_0
c  in DIMACS:
 14096  14097 -14098 -299 -14099 0
 14096  14097 -14098 -299  14100 0
 14096  14097 -14098 -299 -14101 0

c  2+1 --> break 
c    (-b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧  p_299) -> break
c  in CNF:
c     b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ -p_299 ∨ break
c  in DIMACS:
 14096 -14097  14098 -299 1162 0


c  2-1 --> 1
c    (-b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧ -p_299) -> (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0)
c  in CNF:
c     b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_2
c     b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_1
c     b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨  b^{23, 14}_0
c  in DIMACS:
 14096 -14097  14098  299 -14099 0
 14096 -14097  14098  299 -14100 0
 14096 -14097  14098  299  14101 0

c  1-1 --> 0
c    (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0 ∧ -p_299) -> (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧ -b^{23, 14}_0)
c  in CNF:
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_2
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_1
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_0
c  in DIMACS:
 14096  14097 -14098  299 -14099 0
 14096  14097 -14098  299 -14100 0
 14096  14097 -14098  299 -14101 0

c  0-1 --> -1
c    (-b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧ -p_299) -> ( b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0)
c  in CNF:
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨  b^{23, 14}_2
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_1
c     b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨  b^{23, 14}_0
c  in DIMACS:
 14096  14097  14098  299  14099 0
 14096  14097  14098  299 -14100 0
 14096  14097  14098  299  14101 0

c  -1-1 --> -2
c    ( b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧  b^{23, 13}_0 ∧ -p_299) -> ( b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0)
c  in CNF:
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨  b^{23, 14}_2
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨  b^{23, 14}_1
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨  p_299 ∨ -b^{23, 14}_0
c  in DIMACS:
-14096  14097 -14098  299  14099 0
-14096  14097 -14098  299  14100 0
-14096  14097 -14098  299 -14101 0

c  -2-1 --> break 
c    ( b^{23, 13}_2 ∧  b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧ -p_299) -> break
c  in CNF:
c    -b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨  b^{23, 13}_0 ∨  p_299 ∨ break
c  in DIMACS:
-14096 -14097  14098  299 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 13}_2 ∧ -b^{23, 13}_1 ∧ -b^{23, 13}_0 ∧ true) 
c  in CNF:
c    -b^{23, 13}_2 ∨  b^{23, 13}_1 ∨  b^{23, 13}_0 ∨ false 
c  in DIMACS:
-14096  14097  14098  0

c  3 does not represent an automaton state.
c    -(-b^{23, 13}_2 ∧  b^{23, 13}_1 ∧  b^{23, 13}_0 ∧ true) 
c  in CNF:
c     b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ false 
c  in DIMACS:
 14096 -14097 -14098  0
c  -3 does not represent an automaton state.
c    -( b^{23, 13}_2 ∧  b^{23, 13}_1 ∧  b^{23, 13}_0 ∧ true) 
c  in CNF:
c    -b^{23, 13}_2 ∨ -b^{23, 13}_1 ∨ -b^{23, 13}_0 ∨ false 
c  in DIMACS:
-14096 -14097 -14098  0

c i = 14
c  -2+1 --> -1
c    ( b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧  p_322) -> ( b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0)
c  in CNF:
c    -b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨  b^{23, 15}_2
c    -b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_1
c    -b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨  b^{23, 15}_0
c  in DIMACS:
-14099 -14100  14101 -322  14102 0
-14099 -14100  14101 -322 -14103 0
-14099 -14100  14101 -322  14104 0

c  -1+1 --> 0
c    ( b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0 ∧  p_322) -> (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧ -b^{23, 15}_0)
c  in CNF:
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_2
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_1
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_0
c  in DIMACS:
-14099  14100 -14101 -322 -14102 0
-14099  14100 -14101 -322 -14103 0
-14099  14100 -14101 -322 -14104 0

c  0+1 --> 1
c    (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧  p_322) -> (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0)
c  in CNF:
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_2
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_1
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨  b^{23, 15}_0
c  in DIMACS:
 14099  14100  14101 -322 -14102 0
 14099  14100  14101 -322 -14103 0
 14099  14100  14101 -322  14104 0

c  1+1 --> 2
c    (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0 ∧  p_322) -> (-b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0)
c  in CNF:
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_2
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨  b^{23, 15}_1
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ -p_322 ∨ -b^{23, 15}_0
c  in DIMACS:
 14099  14100 -14101 -322 -14102 0
 14099  14100 -14101 -322  14103 0
 14099  14100 -14101 -322 -14104 0

c  2+1 --> break 
c    (-b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧  p_322) -> break
c  in CNF:
c     b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 14099 -14100  14101 -322 1162 0


c  2-1 --> 1
c    (-b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧ -p_322) -> (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0)
c  in CNF:
c     b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_2
c     b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_1
c     b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨  b^{23, 15}_0
c  in DIMACS:
 14099 -14100  14101  322 -14102 0
 14099 -14100  14101  322 -14103 0
 14099 -14100  14101  322  14104 0

c  1-1 --> 0
c    (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0 ∧ -p_322) -> (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧ -b^{23, 15}_0)
c  in CNF:
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_2
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_1
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_0
c  in DIMACS:
 14099  14100 -14101  322 -14102 0
 14099  14100 -14101  322 -14103 0
 14099  14100 -14101  322 -14104 0

c  0-1 --> -1
c    (-b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧ -p_322) -> ( b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0)
c  in CNF:
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨  b^{23, 15}_2
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_1
c     b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨  b^{23, 15}_0
c  in DIMACS:
 14099  14100  14101  322  14102 0
 14099  14100  14101  322 -14103 0
 14099  14100  14101  322  14104 0

c  -1-1 --> -2
c    ( b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧  b^{23, 14}_0 ∧ -p_322) -> ( b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0)
c  in CNF:
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨  b^{23, 15}_2
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨  b^{23, 15}_1
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨  p_322 ∨ -b^{23, 15}_0
c  in DIMACS:
-14099  14100 -14101  322  14102 0
-14099  14100 -14101  322  14103 0
-14099  14100 -14101  322 -14104 0

c  -2-1 --> break 
c    ( b^{23, 14}_2 ∧  b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨  b^{23, 14}_0 ∨  p_322 ∨ break
c  in DIMACS:
-14099 -14100  14101  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 14}_2 ∧ -b^{23, 14}_1 ∧ -b^{23, 14}_0 ∧ true) 
c  in CNF:
c    -b^{23, 14}_2 ∨  b^{23, 14}_1 ∨  b^{23, 14}_0 ∨ false 
c  in DIMACS:
-14099  14100  14101  0

c  3 does not represent an automaton state.
c    -(-b^{23, 14}_2 ∧  b^{23, 14}_1 ∧  b^{23, 14}_0 ∧ true) 
c  in CNF:
c     b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ false 
c  in DIMACS:
 14099 -14100 -14101  0
c  -3 does not represent an automaton state.
c    -( b^{23, 14}_2 ∧  b^{23, 14}_1 ∧  b^{23, 14}_0 ∧ true) 
c  in CNF:
c    -b^{23, 14}_2 ∨ -b^{23, 14}_1 ∨ -b^{23, 14}_0 ∨ false 
c  in DIMACS:
-14099 -14100 -14101  0

c i = 15
c  -2+1 --> -1
c    ( b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧  p_345) -> ( b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0)
c  in CNF:
c    -b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨  b^{23, 16}_2
c    -b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_1
c    -b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨  b^{23, 16}_0
c  in DIMACS:
-14102 -14103  14104 -345  14105 0
-14102 -14103  14104 -345 -14106 0
-14102 -14103  14104 -345  14107 0

c  -1+1 --> 0
c    ( b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0 ∧  p_345) -> (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧ -b^{23, 16}_0)
c  in CNF:
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_2
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_1
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_0
c  in DIMACS:
-14102  14103 -14104 -345 -14105 0
-14102  14103 -14104 -345 -14106 0
-14102  14103 -14104 -345 -14107 0

c  0+1 --> 1
c    (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧  p_345) -> (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0)
c  in CNF:
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_2
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_1
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨  b^{23, 16}_0
c  in DIMACS:
 14102  14103  14104 -345 -14105 0
 14102  14103  14104 -345 -14106 0
 14102  14103  14104 -345  14107 0

c  1+1 --> 2
c    (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0 ∧  p_345) -> (-b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0)
c  in CNF:
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_2
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨  b^{23, 16}_1
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ -p_345 ∨ -b^{23, 16}_0
c  in DIMACS:
 14102  14103 -14104 -345 -14105 0
 14102  14103 -14104 -345  14106 0
 14102  14103 -14104 -345 -14107 0

c  2+1 --> break 
c    (-b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧  p_345) -> break
c  in CNF:
c     b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 14102 -14103  14104 -345 1162 0


c  2-1 --> 1
c    (-b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧ -p_345) -> (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0)
c  in CNF:
c     b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_2
c     b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_1
c     b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨  b^{23, 16}_0
c  in DIMACS:
 14102 -14103  14104  345 -14105 0
 14102 -14103  14104  345 -14106 0
 14102 -14103  14104  345  14107 0

c  1-1 --> 0
c    (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0 ∧ -p_345) -> (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧ -b^{23, 16}_0)
c  in CNF:
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_2
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_1
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_0
c  in DIMACS:
 14102  14103 -14104  345 -14105 0
 14102  14103 -14104  345 -14106 0
 14102  14103 -14104  345 -14107 0

c  0-1 --> -1
c    (-b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧ -p_345) -> ( b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0)
c  in CNF:
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨  b^{23, 16}_2
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_1
c     b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨  b^{23, 16}_0
c  in DIMACS:
 14102  14103  14104  345  14105 0
 14102  14103  14104  345 -14106 0
 14102  14103  14104  345  14107 0

c  -1-1 --> -2
c    ( b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧  b^{23, 15}_0 ∧ -p_345) -> ( b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0)
c  in CNF:
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨  b^{23, 16}_2
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨  b^{23, 16}_1
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨  p_345 ∨ -b^{23, 16}_0
c  in DIMACS:
-14102  14103 -14104  345  14105 0
-14102  14103 -14104  345  14106 0
-14102  14103 -14104  345 -14107 0

c  -2-1 --> break 
c    ( b^{23, 15}_2 ∧  b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨  b^{23, 15}_0 ∨  p_345 ∨ break
c  in DIMACS:
-14102 -14103  14104  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 15}_2 ∧ -b^{23, 15}_1 ∧ -b^{23, 15}_0 ∧ true) 
c  in CNF:
c    -b^{23, 15}_2 ∨  b^{23, 15}_1 ∨  b^{23, 15}_0 ∨ false 
c  in DIMACS:
-14102  14103  14104  0

c  3 does not represent an automaton state.
c    -(-b^{23, 15}_2 ∧  b^{23, 15}_1 ∧  b^{23, 15}_0 ∧ true) 
c  in CNF:
c     b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ false 
c  in DIMACS:
 14102 -14103 -14104  0
c  -3 does not represent an automaton state.
c    -( b^{23, 15}_2 ∧  b^{23, 15}_1 ∧  b^{23, 15}_0 ∧ true) 
c  in CNF:
c    -b^{23, 15}_2 ∨ -b^{23, 15}_1 ∨ -b^{23, 15}_0 ∨ false 
c  in DIMACS:
-14102 -14103 -14104  0

c i = 16
c  -2+1 --> -1
c    ( b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧  p_368) -> ( b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0)
c  in CNF:
c    -b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨  b^{23, 17}_2
c    -b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_1
c    -b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨  b^{23, 17}_0
c  in DIMACS:
-14105 -14106  14107 -368  14108 0
-14105 -14106  14107 -368 -14109 0
-14105 -14106  14107 -368  14110 0

c  -1+1 --> 0
c    ( b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0 ∧  p_368) -> (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧ -b^{23, 17}_0)
c  in CNF:
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_2
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_1
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_0
c  in DIMACS:
-14105  14106 -14107 -368 -14108 0
-14105  14106 -14107 -368 -14109 0
-14105  14106 -14107 -368 -14110 0

c  0+1 --> 1
c    (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧  p_368) -> (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0)
c  in CNF:
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_2
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_1
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨  b^{23, 17}_0
c  in DIMACS:
 14105  14106  14107 -368 -14108 0
 14105  14106  14107 -368 -14109 0
 14105  14106  14107 -368  14110 0

c  1+1 --> 2
c    (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0 ∧  p_368) -> (-b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0)
c  in CNF:
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_2
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨  b^{23, 17}_1
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ -p_368 ∨ -b^{23, 17}_0
c  in DIMACS:
 14105  14106 -14107 -368 -14108 0
 14105  14106 -14107 -368  14109 0
 14105  14106 -14107 -368 -14110 0

c  2+1 --> break 
c    (-b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧  p_368) -> break
c  in CNF:
c     b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 14105 -14106  14107 -368 1162 0


c  2-1 --> 1
c    (-b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧ -p_368) -> (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0)
c  in CNF:
c     b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_2
c     b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_1
c     b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨  b^{23, 17}_0
c  in DIMACS:
 14105 -14106  14107  368 -14108 0
 14105 -14106  14107  368 -14109 0
 14105 -14106  14107  368  14110 0

c  1-1 --> 0
c    (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0 ∧ -p_368) -> (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧ -b^{23, 17}_0)
c  in CNF:
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_2
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_1
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_0
c  in DIMACS:
 14105  14106 -14107  368 -14108 0
 14105  14106 -14107  368 -14109 0
 14105  14106 -14107  368 -14110 0

c  0-1 --> -1
c    (-b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧ -p_368) -> ( b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0)
c  in CNF:
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨  b^{23, 17}_2
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_1
c     b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨  b^{23, 17}_0
c  in DIMACS:
 14105  14106  14107  368  14108 0
 14105  14106  14107  368 -14109 0
 14105  14106  14107  368  14110 0

c  -1-1 --> -2
c    ( b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧  b^{23, 16}_0 ∧ -p_368) -> ( b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0)
c  in CNF:
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨  b^{23, 17}_2
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨  b^{23, 17}_1
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨  p_368 ∨ -b^{23, 17}_0
c  in DIMACS:
-14105  14106 -14107  368  14108 0
-14105  14106 -14107  368  14109 0
-14105  14106 -14107  368 -14110 0

c  -2-1 --> break 
c    ( b^{23, 16}_2 ∧  b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨  b^{23, 16}_0 ∨  p_368 ∨ break
c  in DIMACS:
-14105 -14106  14107  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 16}_2 ∧ -b^{23, 16}_1 ∧ -b^{23, 16}_0 ∧ true) 
c  in CNF:
c    -b^{23, 16}_2 ∨  b^{23, 16}_1 ∨  b^{23, 16}_0 ∨ false 
c  in DIMACS:
-14105  14106  14107  0

c  3 does not represent an automaton state.
c    -(-b^{23, 16}_2 ∧  b^{23, 16}_1 ∧  b^{23, 16}_0 ∧ true) 
c  in CNF:
c     b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ false 
c  in DIMACS:
 14105 -14106 -14107  0
c  -3 does not represent an automaton state.
c    -( b^{23, 16}_2 ∧  b^{23, 16}_1 ∧  b^{23, 16}_0 ∧ true) 
c  in CNF:
c    -b^{23, 16}_2 ∨ -b^{23, 16}_1 ∨ -b^{23, 16}_0 ∨ false 
c  in DIMACS:
-14105 -14106 -14107  0

c i = 17
c  -2+1 --> -1
c    ( b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧  p_391) -> ( b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0)
c  in CNF:
c    -b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨  b^{23, 18}_2
c    -b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_1
c    -b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨  b^{23, 18}_0
c  in DIMACS:
-14108 -14109  14110 -391  14111 0
-14108 -14109  14110 -391 -14112 0
-14108 -14109  14110 -391  14113 0

c  -1+1 --> 0
c    ( b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0 ∧  p_391) -> (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧ -b^{23, 18}_0)
c  in CNF:
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_2
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_1
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_0
c  in DIMACS:
-14108  14109 -14110 -391 -14111 0
-14108  14109 -14110 -391 -14112 0
-14108  14109 -14110 -391 -14113 0

c  0+1 --> 1
c    (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧  p_391) -> (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0)
c  in CNF:
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_2
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_1
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨  b^{23, 18}_0
c  in DIMACS:
 14108  14109  14110 -391 -14111 0
 14108  14109  14110 -391 -14112 0
 14108  14109  14110 -391  14113 0

c  1+1 --> 2
c    (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0 ∧  p_391) -> (-b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0)
c  in CNF:
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_2
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨  b^{23, 18}_1
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ -p_391 ∨ -b^{23, 18}_0
c  in DIMACS:
 14108  14109 -14110 -391 -14111 0
 14108  14109 -14110 -391  14112 0
 14108  14109 -14110 -391 -14113 0

c  2+1 --> break 
c    (-b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧  p_391) -> break
c  in CNF:
c     b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ -p_391 ∨ break
c  in DIMACS:
 14108 -14109  14110 -391 1162 0


c  2-1 --> 1
c    (-b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧ -p_391) -> (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0)
c  in CNF:
c     b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_2
c     b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_1
c     b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨  b^{23, 18}_0
c  in DIMACS:
 14108 -14109  14110  391 -14111 0
 14108 -14109  14110  391 -14112 0
 14108 -14109  14110  391  14113 0

c  1-1 --> 0
c    (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0 ∧ -p_391) -> (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧ -b^{23, 18}_0)
c  in CNF:
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_2
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_1
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_0
c  in DIMACS:
 14108  14109 -14110  391 -14111 0
 14108  14109 -14110  391 -14112 0
 14108  14109 -14110  391 -14113 0

c  0-1 --> -1
c    (-b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧ -p_391) -> ( b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0)
c  in CNF:
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨  b^{23, 18}_2
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_1
c     b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨  b^{23, 18}_0
c  in DIMACS:
 14108  14109  14110  391  14111 0
 14108  14109  14110  391 -14112 0
 14108  14109  14110  391  14113 0

c  -1-1 --> -2
c    ( b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧  b^{23, 17}_0 ∧ -p_391) -> ( b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0)
c  in CNF:
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨  b^{23, 18}_2
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨  b^{23, 18}_1
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨  p_391 ∨ -b^{23, 18}_0
c  in DIMACS:
-14108  14109 -14110  391  14111 0
-14108  14109 -14110  391  14112 0
-14108  14109 -14110  391 -14113 0

c  -2-1 --> break 
c    ( b^{23, 17}_2 ∧  b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧ -p_391) -> break
c  in CNF:
c    -b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨  b^{23, 17}_0 ∨  p_391 ∨ break
c  in DIMACS:
-14108 -14109  14110  391 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 17}_2 ∧ -b^{23, 17}_1 ∧ -b^{23, 17}_0 ∧ true) 
c  in CNF:
c    -b^{23, 17}_2 ∨  b^{23, 17}_1 ∨  b^{23, 17}_0 ∨ false 
c  in DIMACS:
-14108  14109  14110  0

c  3 does not represent an automaton state.
c    -(-b^{23, 17}_2 ∧  b^{23, 17}_1 ∧  b^{23, 17}_0 ∧ true) 
c  in CNF:
c     b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ false 
c  in DIMACS:
 14108 -14109 -14110  0
c  -3 does not represent an automaton state.
c    -( b^{23, 17}_2 ∧  b^{23, 17}_1 ∧  b^{23, 17}_0 ∧ true) 
c  in CNF:
c    -b^{23, 17}_2 ∨ -b^{23, 17}_1 ∨ -b^{23, 17}_0 ∨ false 
c  in DIMACS:
-14108 -14109 -14110  0

c i = 18
c  -2+1 --> -1
c    ( b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧  p_414) -> ( b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0)
c  in CNF:
c    -b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨  b^{23, 19}_2
c    -b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_1
c    -b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨  b^{23, 19}_0
c  in DIMACS:
-14111 -14112  14113 -414  14114 0
-14111 -14112  14113 -414 -14115 0
-14111 -14112  14113 -414  14116 0

c  -1+1 --> 0
c    ( b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0 ∧  p_414) -> (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧ -b^{23, 19}_0)
c  in CNF:
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_2
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_1
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_0
c  in DIMACS:
-14111  14112 -14113 -414 -14114 0
-14111  14112 -14113 -414 -14115 0
-14111  14112 -14113 -414 -14116 0

c  0+1 --> 1
c    (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧  p_414) -> (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0)
c  in CNF:
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_2
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_1
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨  b^{23, 19}_0
c  in DIMACS:
 14111  14112  14113 -414 -14114 0
 14111  14112  14113 -414 -14115 0
 14111  14112  14113 -414  14116 0

c  1+1 --> 2
c    (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0 ∧  p_414) -> (-b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0)
c  in CNF:
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_2
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨  b^{23, 19}_1
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ -p_414 ∨ -b^{23, 19}_0
c  in DIMACS:
 14111  14112 -14113 -414 -14114 0
 14111  14112 -14113 -414  14115 0
 14111  14112 -14113 -414 -14116 0

c  2+1 --> break 
c    (-b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧  p_414) -> break
c  in CNF:
c     b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 14111 -14112  14113 -414 1162 0


c  2-1 --> 1
c    (-b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧ -p_414) -> (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0)
c  in CNF:
c     b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_2
c     b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_1
c     b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨  b^{23, 19}_0
c  in DIMACS:
 14111 -14112  14113  414 -14114 0
 14111 -14112  14113  414 -14115 0
 14111 -14112  14113  414  14116 0

c  1-1 --> 0
c    (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0 ∧ -p_414) -> (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧ -b^{23, 19}_0)
c  in CNF:
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_2
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_1
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_0
c  in DIMACS:
 14111  14112 -14113  414 -14114 0
 14111  14112 -14113  414 -14115 0
 14111  14112 -14113  414 -14116 0

c  0-1 --> -1
c    (-b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧ -p_414) -> ( b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0)
c  in CNF:
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨  b^{23, 19}_2
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_1
c     b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨  b^{23, 19}_0
c  in DIMACS:
 14111  14112  14113  414  14114 0
 14111  14112  14113  414 -14115 0
 14111  14112  14113  414  14116 0

c  -1-1 --> -2
c    ( b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧  b^{23, 18}_0 ∧ -p_414) -> ( b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0)
c  in CNF:
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨  b^{23, 19}_2
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨  b^{23, 19}_1
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨  p_414 ∨ -b^{23, 19}_0
c  in DIMACS:
-14111  14112 -14113  414  14114 0
-14111  14112 -14113  414  14115 0
-14111  14112 -14113  414 -14116 0

c  -2-1 --> break 
c    ( b^{23, 18}_2 ∧  b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨  b^{23, 18}_0 ∨  p_414 ∨ break
c  in DIMACS:
-14111 -14112  14113  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 18}_2 ∧ -b^{23, 18}_1 ∧ -b^{23, 18}_0 ∧ true) 
c  in CNF:
c    -b^{23, 18}_2 ∨  b^{23, 18}_1 ∨  b^{23, 18}_0 ∨ false 
c  in DIMACS:
-14111  14112  14113  0

c  3 does not represent an automaton state.
c    -(-b^{23, 18}_2 ∧  b^{23, 18}_1 ∧  b^{23, 18}_0 ∧ true) 
c  in CNF:
c     b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ false 
c  in DIMACS:
 14111 -14112 -14113  0
c  -3 does not represent an automaton state.
c    -( b^{23, 18}_2 ∧  b^{23, 18}_1 ∧  b^{23, 18}_0 ∧ true) 
c  in CNF:
c    -b^{23, 18}_2 ∨ -b^{23, 18}_1 ∨ -b^{23, 18}_0 ∨ false 
c  in DIMACS:
-14111 -14112 -14113  0

c i = 19
c  -2+1 --> -1
c    ( b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧  p_437) -> ( b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0)
c  in CNF:
c    -b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨  b^{23, 20}_2
c    -b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_1
c    -b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨  b^{23, 20}_0
c  in DIMACS:
-14114 -14115  14116 -437  14117 0
-14114 -14115  14116 -437 -14118 0
-14114 -14115  14116 -437  14119 0

c  -1+1 --> 0
c    ( b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0 ∧  p_437) -> (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧ -b^{23, 20}_0)
c  in CNF:
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_2
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_1
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_0
c  in DIMACS:
-14114  14115 -14116 -437 -14117 0
-14114  14115 -14116 -437 -14118 0
-14114  14115 -14116 -437 -14119 0

c  0+1 --> 1
c    (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧  p_437) -> (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0)
c  in CNF:
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_2
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_1
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨  b^{23, 20}_0
c  in DIMACS:
 14114  14115  14116 -437 -14117 0
 14114  14115  14116 -437 -14118 0
 14114  14115  14116 -437  14119 0

c  1+1 --> 2
c    (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0 ∧  p_437) -> (-b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0)
c  in CNF:
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_2
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨  b^{23, 20}_1
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ -p_437 ∨ -b^{23, 20}_0
c  in DIMACS:
 14114  14115 -14116 -437 -14117 0
 14114  14115 -14116 -437  14118 0
 14114  14115 -14116 -437 -14119 0

c  2+1 --> break 
c    (-b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧  p_437) -> break
c  in CNF:
c     b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ -p_437 ∨ break
c  in DIMACS:
 14114 -14115  14116 -437 1162 0


c  2-1 --> 1
c    (-b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧ -p_437) -> (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0)
c  in CNF:
c     b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_2
c     b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_1
c     b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨  b^{23, 20}_0
c  in DIMACS:
 14114 -14115  14116  437 -14117 0
 14114 -14115  14116  437 -14118 0
 14114 -14115  14116  437  14119 0

c  1-1 --> 0
c    (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0 ∧ -p_437) -> (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧ -b^{23, 20}_0)
c  in CNF:
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_2
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_1
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_0
c  in DIMACS:
 14114  14115 -14116  437 -14117 0
 14114  14115 -14116  437 -14118 0
 14114  14115 -14116  437 -14119 0

c  0-1 --> -1
c    (-b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧ -p_437) -> ( b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0)
c  in CNF:
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨  b^{23, 20}_2
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_1
c     b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨  b^{23, 20}_0
c  in DIMACS:
 14114  14115  14116  437  14117 0
 14114  14115  14116  437 -14118 0
 14114  14115  14116  437  14119 0

c  -1-1 --> -2
c    ( b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧  b^{23, 19}_0 ∧ -p_437) -> ( b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0)
c  in CNF:
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨  b^{23, 20}_2
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨  b^{23, 20}_1
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨  p_437 ∨ -b^{23, 20}_0
c  in DIMACS:
-14114  14115 -14116  437  14117 0
-14114  14115 -14116  437  14118 0
-14114  14115 -14116  437 -14119 0

c  -2-1 --> break 
c    ( b^{23, 19}_2 ∧  b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧ -p_437) -> break
c  in CNF:
c    -b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨  b^{23, 19}_0 ∨  p_437 ∨ break
c  in DIMACS:
-14114 -14115  14116  437 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 19}_2 ∧ -b^{23, 19}_1 ∧ -b^{23, 19}_0 ∧ true) 
c  in CNF:
c    -b^{23, 19}_2 ∨  b^{23, 19}_1 ∨  b^{23, 19}_0 ∨ false 
c  in DIMACS:
-14114  14115  14116  0

c  3 does not represent an automaton state.
c    -(-b^{23, 19}_2 ∧  b^{23, 19}_1 ∧  b^{23, 19}_0 ∧ true) 
c  in CNF:
c     b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ false 
c  in DIMACS:
 14114 -14115 -14116  0
c  -3 does not represent an automaton state.
c    -( b^{23, 19}_2 ∧  b^{23, 19}_1 ∧  b^{23, 19}_0 ∧ true) 
c  in CNF:
c    -b^{23, 19}_2 ∨ -b^{23, 19}_1 ∨ -b^{23, 19}_0 ∨ false 
c  in DIMACS:
-14114 -14115 -14116  0

c i = 20
c  -2+1 --> -1
c    ( b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧  p_460) -> ( b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0)
c  in CNF:
c    -b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨  b^{23, 21}_2
c    -b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_1
c    -b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨  b^{23, 21}_0
c  in DIMACS:
-14117 -14118  14119 -460  14120 0
-14117 -14118  14119 -460 -14121 0
-14117 -14118  14119 -460  14122 0

c  -1+1 --> 0
c    ( b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0 ∧  p_460) -> (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧ -b^{23, 21}_0)
c  in CNF:
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_2
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_1
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_0
c  in DIMACS:
-14117  14118 -14119 -460 -14120 0
-14117  14118 -14119 -460 -14121 0
-14117  14118 -14119 -460 -14122 0

c  0+1 --> 1
c    (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧  p_460) -> (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0)
c  in CNF:
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_2
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_1
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨  b^{23, 21}_0
c  in DIMACS:
 14117  14118  14119 -460 -14120 0
 14117  14118  14119 -460 -14121 0
 14117  14118  14119 -460  14122 0

c  1+1 --> 2
c    (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0 ∧  p_460) -> (-b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0)
c  in CNF:
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_2
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨  b^{23, 21}_1
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ -p_460 ∨ -b^{23, 21}_0
c  in DIMACS:
 14117  14118 -14119 -460 -14120 0
 14117  14118 -14119 -460  14121 0
 14117  14118 -14119 -460 -14122 0

c  2+1 --> break 
c    (-b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧  p_460) -> break
c  in CNF:
c     b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 14117 -14118  14119 -460 1162 0


c  2-1 --> 1
c    (-b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧ -p_460) -> (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0)
c  in CNF:
c     b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_2
c     b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_1
c     b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨  b^{23, 21}_0
c  in DIMACS:
 14117 -14118  14119  460 -14120 0
 14117 -14118  14119  460 -14121 0
 14117 -14118  14119  460  14122 0

c  1-1 --> 0
c    (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0 ∧ -p_460) -> (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧ -b^{23, 21}_0)
c  in CNF:
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_2
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_1
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_0
c  in DIMACS:
 14117  14118 -14119  460 -14120 0
 14117  14118 -14119  460 -14121 0
 14117  14118 -14119  460 -14122 0

c  0-1 --> -1
c    (-b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧ -p_460) -> ( b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0)
c  in CNF:
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨  b^{23, 21}_2
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_1
c     b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨  b^{23, 21}_0
c  in DIMACS:
 14117  14118  14119  460  14120 0
 14117  14118  14119  460 -14121 0
 14117  14118  14119  460  14122 0

c  -1-1 --> -2
c    ( b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧  b^{23, 20}_0 ∧ -p_460) -> ( b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0)
c  in CNF:
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨  b^{23, 21}_2
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨  b^{23, 21}_1
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨  p_460 ∨ -b^{23, 21}_0
c  in DIMACS:
-14117  14118 -14119  460  14120 0
-14117  14118 -14119  460  14121 0
-14117  14118 -14119  460 -14122 0

c  -2-1 --> break 
c    ( b^{23, 20}_2 ∧  b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨  b^{23, 20}_0 ∨  p_460 ∨ break
c  in DIMACS:
-14117 -14118  14119  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 20}_2 ∧ -b^{23, 20}_1 ∧ -b^{23, 20}_0 ∧ true) 
c  in CNF:
c    -b^{23, 20}_2 ∨  b^{23, 20}_1 ∨  b^{23, 20}_0 ∨ false 
c  in DIMACS:
-14117  14118  14119  0

c  3 does not represent an automaton state.
c    -(-b^{23, 20}_2 ∧  b^{23, 20}_1 ∧  b^{23, 20}_0 ∧ true) 
c  in CNF:
c     b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ false 
c  in DIMACS:
 14117 -14118 -14119  0
c  -3 does not represent an automaton state.
c    -( b^{23, 20}_2 ∧  b^{23, 20}_1 ∧  b^{23, 20}_0 ∧ true) 
c  in CNF:
c    -b^{23, 20}_2 ∨ -b^{23, 20}_1 ∨ -b^{23, 20}_0 ∨ false 
c  in DIMACS:
-14117 -14118 -14119  0

c i = 21
c  -2+1 --> -1
c    ( b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧  p_483) -> ( b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0)
c  in CNF:
c    -b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨  b^{23, 22}_2
c    -b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_1
c    -b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨  b^{23, 22}_0
c  in DIMACS:
-14120 -14121  14122 -483  14123 0
-14120 -14121  14122 -483 -14124 0
-14120 -14121  14122 -483  14125 0

c  -1+1 --> 0
c    ( b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0 ∧  p_483) -> (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧ -b^{23, 22}_0)
c  in CNF:
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_2
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_1
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_0
c  in DIMACS:
-14120  14121 -14122 -483 -14123 0
-14120  14121 -14122 -483 -14124 0
-14120  14121 -14122 -483 -14125 0

c  0+1 --> 1
c    (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧  p_483) -> (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0)
c  in CNF:
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_2
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_1
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨  b^{23, 22}_0
c  in DIMACS:
 14120  14121  14122 -483 -14123 0
 14120  14121  14122 -483 -14124 0
 14120  14121  14122 -483  14125 0

c  1+1 --> 2
c    (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0 ∧  p_483) -> (-b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0)
c  in CNF:
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_2
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨  b^{23, 22}_1
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ -p_483 ∨ -b^{23, 22}_0
c  in DIMACS:
 14120  14121 -14122 -483 -14123 0
 14120  14121 -14122 -483  14124 0
 14120  14121 -14122 -483 -14125 0

c  2+1 --> break 
c    (-b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧  p_483) -> break
c  in CNF:
c     b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 14120 -14121  14122 -483 1162 0


c  2-1 --> 1
c    (-b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧ -p_483) -> (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0)
c  in CNF:
c     b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_2
c     b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_1
c     b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨  b^{23, 22}_0
c  in DIMACS:
 14120 -14121  14122  483 -14123 0
 14120 -14121  14122  483 -14124 0
 14120 -14121  14122  483  14125 0

c  1-1 --> 0
c    (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0 ∧ -p_483) -> (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧ -b^{23, 22}_0)
c  in CNF:
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_2
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_1
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_0
c  in DIMACS:
 14120  14121 -14122  483 -14123 0
 14120  14121 -14122  483 -14124 0
 14120  14121 -14122  483 -14125 0

c  0-1 --> -1
c    (-b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧ -p_483) -> ( b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0)
c  in CNF:
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨  b^{23, 22}_2
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_1
c     b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨  b^{23, 22}_0
c  in DIMACS:
 14120  14121  14122  483  14123 0
 14120  14121  14122  483 -14124 0
 14120  14121  14122  483  14125 0

c  -1-1 --> -2
c    ( b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧  b^{23, 21}_0 ∧ -p_483) -> ( b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0)
c  in CNF:
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨  b^{23, 22}_2
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨  b^{23, 22}_1
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨  p_483 ∨ -b^{23, 22}_0
c  in DIMACS:
-14120  14121 -14122  483  14123 0
-14120  14121 -14122  483  14124 0
-14120  14121 -14122  483 -14125 0

c  -2-1 --> break 
c    ( b^{23, 21}_2 ∧  b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨  b^{23, 21}_0 ∨  p_483 ∨ break
c  in DIMACS:
-14120 -14121  14122  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 21}_2 ∧ -b^{23, 21}_1 ∧ -b^{23, 21}_0 ∧ true) 
c  in CNF:
c    -b^{23, 21}_2 ∨  b^{23, 21}_1 ∨  b^{23, 21}_0 ∨ false 
c  in DIMACS:
-14120  14121  14122  0

c  3 does not represent an automaton state.
c    -(-b^{23, 21}_2 ∧  b^{23, 21}_1 ∧  b^{23, 21}_0 ∧ true) 
c  in CNF:
c     b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ false 
c  in DIMACS:
 14120 -14121 -14122  0
c  -3 does not represent an automaton state.
c    -( b^{23, 21}_2 ∧  b^{23, 21}_1 ∧  b^{23, 21}_0 ∧ true) 
c  in CNF:
c    -b^{23, 21}_2 ∨ -b^{23, 21}_1 ∨ -b^{23, 21}_0 ∨ false 
c  in DIMACS:
-14120 -14121 -14122  0

c i = 22
c  -2+1 --> -1
c    ( b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧  p_506) -> ( b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0)
c  in CNF:
c    -b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨  b^{23, 23}_2
c    -b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_1
c    -b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨  b^{23, 23}_0
c  in DIMACS:
-14123 -14124  14125 -506  14126 0
-14123 -14124  14125 -506 -14127 0
-14123 -14124  14125 -506  14128 0

c  -1+1 --> 0
c    ( b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0 ∧  p_506) -> (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧ -b^{23, 23}_0)
c  in CNF:
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_2
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_1
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_0
c  in DIMACS:
-14123  14124 -14125 -506 -14126 0
-14123  14124 -14125 -506 -14127 0
-14123  14124 -14125 -506 -14128 0

c  0+1 --> 1
c    (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧  p_506) -> (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0)
c  in CNF:
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_2
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_1
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨  b^{23, 23}_0
c  in DIMACS:
 14123  14124  14125 -506 -14126 0
 14123  14124  14125 -506 -14127 0
 14123  14124  14125 -506  14128 0

c  1+1 --> 2
c    (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0 ∧  p_506) -> (-b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0)
c  in CNF:
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_2
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨  b^{23, 23}_1
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ -p_506 ∨ -b^{23, 23}_0
c  in DIMACS:
 14123  14124 -14125 -506 -14126 0
 14123  14124 -14125 -506  14127 0
 14123  14124 -14125 -506 -14128 0

c  2+1 --> break 
c    (-b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧  p_506) -> break
c  in CNF:
c     b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 14123 -14124  14125 -506 1162 0


c  2-1 --> 1
c    (-b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧ -p_506) -> (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0)
c  in CNF:
c     b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_2
c     b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_1
c     b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨  b^{23, 23}_0
c  in DIMACS:
 14123 -14124  14125  506 -14126 0
 14123 -14124  14125  506 -14127 0
 14123 -14124  14125  506  14128 0

c  1-1 --> 0
c    (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0 ∧ -p_506) -> (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧ -b^{23, 23}_0)
c  in CNF:
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_2
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_1
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_0
c  in DIMACS:
 14123  14124 -14125  506 -14126 0
 14123  14124 -14125  506 -14127 0
 14123  14124 -14125  506 -14128 0

c  0-1 --> -1
c    (-b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧ -p_506) -> ( b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0)
c  in CNF:
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨  b^{23, 23}_2
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_1
c     b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨  b^{23, 23}_0
c  in DIMACS:
 14123  14124  14125  506  14126 0
 14123  14124  14125  506 -14127 0
 14123  14124  14125  506  14128 0

c  -1-1 --> -2
c    ( b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧  b^{23, 22}_0 ∧ -p_506) -> ( b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0)
c  in CNF:
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨  b^{23, 23}_2
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨  b^{23, 23}_1
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨  p_506 ∨ -b^{23, 23}_0
c  in DIMACS:
-14123  14124 -14125  506  14126 0
-14123  14124 -14125  506  14127 0
-14123  14124 -14125  506 -14128 0

c  -2-1 --> break 
c    ( b^{23, 22}_2 ∧  b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨  b^{23, 22}_0 ∨  p_506 ∨ break
c  in DIMACS:
-14123 -14124  14125  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 22}_2 ∧ -b^{23, 22}_1 ∧ -b^{23, 22}_0 ∧ true) 
c  in CNF:
c    -b^{23, 22}_2 ∨  b^{23, 22}_1 ∨  b^{23, 22}_0 ∨ false 
c  in DIMACS:
-14123  14124  14125  0

c  3 does not represent an automaton state.
c    -(-b^{23, 22}_2 ∧  b^{23, 22}_1 ∧  b^{23, 22}_0 ∧ true) 
c  in CNF:
c     b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ false 
c  in DIMACS:
 14123 -14124 -14125  0
c  -3 does not represent an automaton state.
c    -( b^{23, 22}_2 ∧  b^{23, 22}_1 ∧  b^{23, 22}_0 ∧ true) 
c  in CNF:
c    -b^{23, 22}_2 ∨ -b^{23, 22}_1 ∨ -b^{23, 22}_0 ∨ false 
c  in DIMACS:
-14123 -14124 -14125  0

c i = 23
c  -2+1 --> -1
c    ( b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧  p_529) -> ( b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0)
c  in CNF:
c    -b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨  b^{23, 24}_2
c    -b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_1
c    -b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨  b^{23, 24}_0
c  in DIMACS:
-14126 -14127  14128 -529  14129 0
-14126 -14127  14128 -529 -14130 0
-14126 -14127  14128 -529  14131 0

c  -1+1 --> 0
c    ( b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0 ∧  p_529) -> (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧ -b^{23, 24}_0)
c  in CNF:
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_2
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_1
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_0
c  in DIMACS:
-14126  14127 -14128 -529 -14129 0
-14126  14127 -14128 -529 -14130 0
-14126  14127 -14128 -529 -14131 0

c  0+1 --> 1
c    (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧  p_529) -> (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0)
c  in CNF:
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_2
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_1
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨  b^{23, 24}_0
c  in DIMACS:
 14126  14127  14128 -529 -14129 0
 14126  14127  14128 -529 -14130 0
 14126  14127  14128 -529  14131 0

c  1+1 --> 2
c    (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0 ∧  p_529) -> (-b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0)
c  in CNF:
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_2
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨  b^{23, 24}_1
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ -p_529 ∨ -b^{23, 24}_0
c  in DIMACS:
 14126  14127 -14128 -529 -14129 0
 14126  14127 -14128 -529  14130 0
 14126  14127 -14128 -529 -14131 0

c  2+1 --> break 
c    (-b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧  p_529) -> break
c  in CNF:
c     b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ -p_529 ∨ break
c  in DIMACS:
 14126 -14127  14128 -529 1162 0


c  2-1 --> 1
c    (-b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧ -p_529) -> (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0)
c  in CNF:
c     b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_2
c     b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_1
c     b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨  b^{23, 24}_0
c  in DIMACS:
 14126 -14127  14128  529 -14129 0
 14126 -14127  14128  529 -14130 0
 14126 -14127  14128  529  14131 0

c  1-1 --> 0
c    (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0 ∧ -p_529) -> (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧ -b^{23, 24}_0)
c  in CNF:
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_2
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_1
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_0
c  in DIMACS:
 14126  14127 -14128  529 -14129 0
 14126  14127 -14128  529 -14130 0
 14126  14127 -14128  529 -14131 0

c  0-1 --> -1
c    (-b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧ -p_529) -> ( b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0)
c  in CNF:
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨  b^{23, 24}_2
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_1
c     b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨  b^{23, 24}_0
c  in DIMACS:
 14126  14127  14128  529  14129 0
 14126  14127  14128  529 -14130 0
 14126  14127  14128  529  14131 0

c  -1-1 --> -2
c    ( b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧  b^{23, 23}_0 ∧ -p_529) -> ( b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0)
c  in CNF:
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨  b^{23, 24}_2
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨  b^{23, 24}_1
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨  p_529 ∨ -b^{23, 24}_0
c  in DIMACS:
-14126  14127 -14128  529  14129 0
-14126  14127 -14128  529  14130 0
-14126  14127 -14128  529 -14131 0

c  -2-1 --> break 
c    ( b^{23, 23}_2 ∧  b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧ -p_529) -> break
c  in CNF:
c    -b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨  b^{23, 23}_0 ∨  p_529 ∨ break
c  in DIMACS:
-14126 -14127  14128  529 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 23}_2 ∧ -b^{23, 23}_1 ∧ -b^{23, 23}_0 ∧ true) 
c  in CNF:
c    -b^{23, 23}_2 ∨  b^{23, 23}_1 ∨  b^{23, 23}_0 ∨ false 
c  in DIMACS:
-14126  14127  14128  0

c  3 does not represent an automaton state.
c    -(-b^{23, 23}_2 ∧  b^{23, 23}_1 ∧  b^{23, 23}_0 ∧ true) 
c  in CNF:
c     b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ false 
c  in DIMACS:
 14126 -14127 -14128  0
c  -3 does not represent an automaton state.
c    -( b^{23, 23}_2 ∧  b^{23, 23}_1 ∧  b^{23, 23}_0 ∧ true) 
c  in CNF:
c    -b^{23, 23}_2 ∨ -b^{23, 23}_1 ∨ -b^{23, 23}_0 ∨ false 
c  in DIMACS:
-14126 -14127 -14128  0

c i = 24
c  -2+1 --> -1
c    ( b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧  p_552) -> ( b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0)
c  in CNF:
c    -b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨  b^{23, 25}_2
c    -b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_1
c    -b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨  b^{23, 25}_0
c  in DIMACS:
-14129 -14130  14131 -552  14132 0
-14129 -14130  14131 -552 -14133 0
-14129 -14130  14131 -552  14134 0

c  -1+1 --> 0
c    ( b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0 ∧  p_552) -> (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧ -b^{23, 25}_0)
c  in CNF:
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_2
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_1
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_0
c  in DIMACS:
-14129  14130 -14131 -552 -14132 0
-14129  14130 -14131 -552 -14133 0
-14129  14130 -14131 -552 -14134 0

c  0+1 --> 1
c    (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧  p_552) -> (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0)
c  in CNF:
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_2
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_1
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨  b^{23, 25}_0
c  in DIMACS:
 14129  14130  14131 -552 -14132 0
 14129  14130  14131 -552 -14133 0
 14129  14130  14131 -552  14134 0

c  1+1 --> 2
c    (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0 ∧  p_552) -> (-b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0)
c  in CNF:
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_2
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨  b^{23, 25}_1
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ -p_552 ∨ -b^{23, 25}_0
c  in DIMACS:
 14129  14130 -14131 -552 -14132 0
 14129  14130 -14131 -552  14133 0
 14129  14130 -14131 -552 -14134 0

c  2+1 --> break 
c    (-b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧  p_552) -> break
c  in CNF:
c     b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 14129 -14130  14131 -552 1162 0


c  2-1 --> 1
c    (-b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧ -p_552) -> (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0)
c  in CNF:
c     b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_2
c     b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_1
c     b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨  b^{23, 25}_0
c  in DIMACS:
 14129 -14130  14131  552 -14132 0
 14129 -14130  14131  552 -14133 0
 14129 -14130  14131  552  14134 0

c  1-1 --> 0
c    (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0 ∧ -p_552) -> (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧ -b^{23, 25}_0)
c  in CNF:
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_2
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_1
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_0
c  in DIMACS:
 14129  14130 -14131  552 -14132 0
 14129  14130 -14131  552 -14133 0
 14129  14130 -14131  552 -14134 0

c  0-1 --> -1
c    (-b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧ -p_552) -> ( b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0)
c  in CNF:
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨  b^{23, 25}_2
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_1
c     b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨  b^{23, 25}_0
c  in DIMACS:
 14129  14130  14131  552  14132 0
 14129  14130  14131  552 -14133 0
 14129  14130  14131  552  14134 0

c  -1-1 --> -2
c    ( b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧  b^{23, 24}_0 ∧ -p_552) -> ( b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0)
c  in CNF:
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨  b^{23, 25}_2
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨  b^{23, 25}_1
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨  p_552 ∨ -b^{23, 25}_0
c  in DIMACS:
-14129  14130 -14131  552  14132 0
-14129  14130 -14131  552  14133 0
-14129  14130 -14131  552 -14134 0

c  -2-1 --> break 
c    ( b^{23, 24}_2 ∧  b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨  b^{23, 24}_0 ∨  p_552 ∨ break
c  in DIMACS:
-14129 -14130  14131  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 24}_2 ∧ -b^{23, 24}_1 ∧ -b^{23, 24}_0 ∧ true) 
c  in CNF:
c    -b^{23, 24}_2 ∨  b^{23, 24}_1 ∨  b^{23, 24}_0 ∨ false 
c  in DIMACS:
-14129  14130  14131  0

c  3 does not represent an automaton state.
c    -(-b^{23, 24}_2 ∧  b^{23, 24}_1 ∧  b^{23, 24}_0 ∧ true) 
c  in CNF:
c     b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ false 
c  in DIMACS:
 14129 -14130 -14131  0
c  -3 does not represent an automaton state.
c    -( b^{23, 24}_2 ∧  b^{23, 24}_1 ∧  b^{23, 24}_0 ∧ true) 
c  in CNF:
c    -b^{23, 24}_2 ∨ -b^{23, 24}_1 ∨ -b^{23, 24}_0 ∨ false 
c  in DIMACS:
-14129 -14130 -14131  0

c i = 25
c  -2+1 --> -1
c    ( b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧  p_575) -> ( b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0)
c  in CNF:
c    -b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨  b^{23, 26}_2
c    -b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_1
c    -b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨  b^{23, 26}_0
c  in DIMACS:
-14132 -14133  14134 -575  14135 0
-14132 -14133  14134 -575 -14136 0
-14132 -14133  14134 -575  14137 0

c  -1+1 --> 0
c    ( b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0 ∧  p_575) -> (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧ -b^{23, 26}_0)
c  in CNF:
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_2
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_1
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_0
c  in DIMACS:
-14132  14133 -14134 -575 -14135 0
-14132  14133 -14134 -575 -14136 0
-14132  14133 -14134 -575 -14137 0

c  0+1 --> 1
c    (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧  p_575) -> (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0)
c  in CNF:
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_2
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_1
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨  b^{23, 26}_0
c  in DIMACS:
 14132  14133  14134 -575 -14135 0
 14132  14133  14134 -575 -14136 0
 14132  14133  14134 -575  14137 0

c  1+1 --> 2
c    (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0 ∧  p_575) -> (-b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0)
c  in CNF:
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_2
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨  b^{23, 26}_1
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ -p_575 ∨ -b^{23, 26}_0
c  in DIMACS:
 14132  14133 -14134 -575 -14135 0
 14132  14133 -14134 -575  14136 0
 14132  14133 -14134 -575 -14137 0

c  2+1 --> break 
c    (-b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧  p_575) -> break
c  in CNF:
c     b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ -p_575 ∨ break
c  in DIMACS:
 14132 -14133  14134 -575 1162 0


c  2-1 --> 1
c    (-b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧ -p_575) -> (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0)
c  in CNF:
c     b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_2
c     b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_1
c     b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨  b^{23, 26}_0
c  in DIMACS:
 14132 -14133  14134  575 -14135 0
 14132 -14133  14134  575 -14136 0
 14132 -14133  14134  575  14137 0

c  1-1 --> 0
c    (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0 ∧ -p_575) -> (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧ -b^{23, 26}_0)
c  in CNF:
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_2
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_1
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_0
c  in DIMACS:
 14132  14133 -14134  575 -14135 0
 14132  14133 -14134  575 -14136 0
 14132  14133 -14134  575 -14137 0

c  0-1 --> -1
c    (-b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧ -p_575) -> ( b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0)
c  in CNF:
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨  b^{23, 26}_2
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_1
c     b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨  b^{23, 26}_0
c  in DIMACS:
 14132  14133  14134  575  14135 0
 14132  14133  14134  575 -14136 0
 14132  14133  14134  575  14137 0

c  -1-1 --> -2
c    ( b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧  b^{23, 25}_0 ∧ -p_575) -> ( b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0)
c  in CNF:
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨  b^{23, 26}_2
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨  b^{23, 26}_1
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨  p_575 ∨ -b^{23, 26}_0
c  in DIMACS:
-14132  14133 -14134  575  14135 0
-14132  14133 -14134  575  14136 0
-14132  14133 -14134  575 -14137 0

c  -2-1 --> break 
c    ( b^{23, 25}_2 ∧  b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧ -p_575) -> break
c  in CNF:
c    -b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨  b^{23, 25}_0 ∨  p_575 ∨ break
c  in DIMACS:
-14132 -14133  14134  575 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 25}_2 ∧ -b^{23, 25}_1 ∧ -b^{23, 25}_0 ∧ true) 
c  in CNF:
c    -b^{23, 25}_2 ∨  b^{23, 25}_1 ∨  b^{23, 25}_0 ∨ false 
c  in DIMACS:
-14132  14133  14134  0

c  3 does not represent an automaton state.
c    -(-b^{23, 25}_2 ∧  b^{23, 25}_1 ∧  b^{23, 25}_0 ∧ true) 
c  in CNF:
c     b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ false 
c  in DIMACS:
 14132 -14133 -14134  0
c  -3 does not represent an automaton state.
c    -( b^{23, 25}_2 ∧  b^{23, 25}_1 ∧  b^{23, 25}_0 ∧ true) 
c  in CNF:
c    -b^{23, 25}_2 ∨ -b^{23, 25}_1 ∨ -b^{23, 25}_0 ∨ false 
c  in DIMACS:
-14132 -14133 -14134  0

c i = 26
c  -2+1 --> -1
c    ( b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧  p_598) -> ( b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0)
c  in CNF:
c    -b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨  b^{23, 27}_2
c    -b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_1
c    -b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨  b^{23, 27}_0
c  in DIMACS:
-14135 -14136  14137 -598  14138 0
-14135 -14136  14137 -598 -14139 0
-14135 -14136  14137 -598  14140 0

c  -1+1 --> 0
c    ( b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0 ∧  p_598) -> (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧ -b^{23, 27}_0)
c  in CNF:
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_2
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_1
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_0
c  in DIMACS:
-14135  14136 -14137 -598 -14138 0
-14135  14136 -14137 -598 -14139 0
-14135  14136 -14137 -598 -14140 0

c  0+1 --> 1
c    (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧  p_598) -> (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0)
c  in CNF:
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_2
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_1
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨  b^{23, 27}_0
c  in DIMACS:
 14135  14136  14137 -598 -14138 0
 14135  14136  14137 -598 -14139 0
 14135  14136  14137 -598  14140 0

c  1+1 --> 2
c    (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0 ∧  p_598) -> (-b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0)
c  in CNF:
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_2
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨  b^{23, 27}_1
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ -p_598 ∨ -b^{23, 27}_0
c  in DIMACS:
 14135  14136 -14137 -598 -14138 0
 14135  14136 -14137 -598  14139 0
 14135  14136 -14137 -598 -14140 0

c  2+1 --> break 
c    (-b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧  p_598) -> break
c  in CNF:
c     b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 14135 -14136  14137 -598 1162 0


c  2-1 --> 1
c    (-b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧ -p_598) -> (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0)
c  in CNF:
c     b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_2
c     b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_1
c     b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨  b^{23, 27}_0
c  in DIMACS:
 14135 -14136  14137  598 -14138 0
 14135 -14136  14137  598 -14139 0
 14135 -14136  14137  598  14140 0

c  1-1 --> 0
c    (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0 ∧ -p_598) -> (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧ -b^{23, 27}_0)
c  in CNF:
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_2
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_1
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_0
c  in DIMACS:
 14135  14136 -14137  598 -14138 0
 14135  14136 -14137  598 -14139 0
 14135  14136 -14137  598 -14140 0

c  0-1 --> -1
c    (-b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧ -p_598) -> ( b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0)
c  in CNF:
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨  b^{23, 27}_2
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_1
c     b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨  b^{23, 27}_0
c  in DIMACS:
 14135  14136  14137  598  14138 0
 14135  14136  14137  598 -14139 0
 14135  14136  14137  598  14140 0

c  -1-1 --> -2
c    ( b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧  b^{23, 26}_0 ∧ -p_598) -> ( b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0)
c  in CNF:
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨  b^{23, 27}_2
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨  b^{23, 27}_1
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨  p_598 ∨ -b^{23, 27}_0
c  in DIMACS:
-14135  14136 -14137  598  14138 0
-14135  14136 -14137  598  14139 0
-14135  14136 -14137  598 -14140 0

c  -2-1 --> break 
c    ( b^{23, 26}_2 ∧  b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨  b^{23, 26}_0 ∨  p_598 ∨ break
c  in DIMACS:
-14135 -14136  14137  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 26}_2 ∧ -b^{23, 26}_1 ∧ -b^{23, 26}_0 ∧ true) 
c  in CNF:
c    -b^{23, 26}_2 ∨  b^{23, 26}_1 ∨  b^{23, 26}_0 ∨ false 
c  in DIMACS:
-14135  14136  14137  0

c  3 does not represent an automaton state.
c    -(-b^{23, 26}_2 ∧  b^{23, 26}_1 ∧  b^{23, 26}_0 ∧ true) 
c  in CNF:
c     b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ false 
c  in DIMACS:
 14135 -14136 -14137  0
c  -3 does not represent an automaton state.
c    -( b^{23, 26}_2 ∧  b^{23, 26}_1 ∧  b^{23, 26}_0 ∧ true) 
c  in CNF:
c    -b^{23, 26}_2 ∨ -b^{23, 26}_1 ∨ -b^{23, 26}_0 ∨ false 
c  in DIMACS:
-14135 -14136 -14137  0

c i = 27
c  -2+1 --> -1
c    ( b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧  p_621) -> ( b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0)
c  in CNF:
c    -b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨  b^{23, 28}_2
c    -b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_1
c    -b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨  b^{23, 28}_0
c  in DIMACS:
-14138 -14139  14140 -621  14141 0
-14138 -14139  14140 -621 -14142 0
-14138 -14139  14140 -621  14143 0

c  -1+1 --> 0
c    ( b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0 ∧  p_621) -> (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧ -b^{23, 28}_0)
c  in CNF:
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_2
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_1
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_0
c  in DIMACS:
-14138  14139 -14140 -621 -14141 0
-14138  14139 -14140 -621 -14142 0
-14138  14139 -14140 -621 -14143 0

c  0+1 --> 1
c    (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧  p_621) -> (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0)
c  in CNF:
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_2
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_1
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨  b^{23, 28}_0
c  in DIMACS:
 14138  14139  14140 -621 -14141 0
 14138  14139  14140 -621 -14142 0
 14138  14139  14140 -621  14143 0

c  1+1 --> 2
c    (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0 ∧  p_621) -> (-b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0)
c  in CNF:
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_2
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨  b^{23, 28}_1
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ -p_621 ∨ -b^{23, 28}_0
c  in DIMACS:
 14138  14139 -14140 -621 -14141 0
 14138  14139 -14140 -621  14142 0
 14138  14139 -14140 -621 -14143 0

c  2+1 --> break 
c    (-b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧  p_621) -> break
c  in CNF:
c     b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 14138 -14139  14140 -621 1162 0


c  2-1 --> 1
c    (-b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧ -p_621) -> (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0)
c  in CNF:
c     b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_2
c     b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_1
c     b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨  b^{23, 28}_0
c  in DIMACS:
 14138 -14139  14140  621 -14141 0
 14138 -14139  14140  621 -14142 0
 14138 -14139  14140  621  14143 0

c  1-1 --> 0
c    (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0 ∧ -p_621) -> (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧ -b^{23, 28}_0)
c  in CNF:
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_2
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_1
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_0
c  in DIMACS:
 14138  14139 -14140  621 -14141 0
 14138  14139 -14140  621 -14142 0
 14138  14139 -14140  621 -14143 0

c  0-1 --> -1
c    (-b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧ -p_621) -> ( b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0)
c  in CNF:
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨  b^{23, 28}_2
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_1
c     b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨  b^{23, 28}_0
c  in DIMACS:
 14138  14139  14140  621  14141 0
 14138  14139  14140  621 -14142 0
 14138  14139  14140  621  14143 0

c  -1-1 --> -2
c    ( b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧  b^{23, 27}_0 ∧ -p_621) -> ( b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0)
c  in CNF:
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨  b^{23, 28}_2
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨  b^{23, 28}_1
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨  p_621 ∨ -b^{23, 28}_0
c  in DIMACS:
-14138  14139 -14140  621  14141 0
-14138  14139 -14140  621  14142 0
-14138  14139 -14140  621 -14143 0

c  -2-1 --> break 
c    ( b^{23, 27}_2 ∧  b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨  b^{23, 27}_0 ∨  p_621 ∨ break
c  in DIMACS:
-14138 -14139  14140  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 27}_2 ∧ -b^{23, 27}_1 ∧ -b^{23, 27}_0 ∧ true) 
c  in CNF:
c    -b^{23, 27}_2 ∨  b^{23, 27}_1 ∨  b^{23, 27}_0 ∨ false 
c  in DIMACS:
-14138  14139  14140  0

c  3 does not represent an automaton state.
c    -(-b^{23, 27}_2 ∧  b^{23, 27}_1 ∧  b^{23, 27}_0 ∧ true) 
c  in CNF:
c     b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ false 
c  in DIMACS:
 14138 -14139 -14140  0
c  -3 does not represent an automaton state.
c    -( b^{23, 27}_2 ∧  b^{23, 27}_1 ∧  b^{23, 27}_0 ∧ true) 
c  in CNF:
c    -b^{23, 27}_2 ∨ -b^{23, 27}_1 ∨ -b^{23, 27}_0 ∨ false 
c  in DIMACS:
-14138 -14139 -14140  0

c i = 28
c  -2+1 --> -1
c    ( b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧  p_644) -> ( b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0)
c  in CNF:
c    -b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨  b^{23, 29}_2
c    -b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_1
c    -b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨  b^{23, 29}_0
c  in DIMACS:
-14141 -14142  14143 -644  14144 0
-14141 -14142  14143 -644 -14145 0
-14141 -14142  14143 -644  14146 0

c  -1+1 --> 0
c    ( b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0 ∧  p_644) -> (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧ -b^{23, 29}_0)
c  in CNF:
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_2
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_1
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_0
c  in DIMACS:
-14141  14142 -14143 -644 -14144 0
-14141  14142 -14143 -644 -14145 0
-14141  14142 -14143 -644 -14146 0

c  0+1 --> 1
c    (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧  p_644) -> (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0)
c  in CNF:
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_2
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_1
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨  b^{23, 29}_0
c  in DIMACS:
 14141  14142  14143 -644 -14144 0
 14141  14142  14143 -644 -14145 0
 14141  14142  14143 -644  14146 0

c  1+1 --> 2
c    (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0 ∧  p_644) -> (-b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0)
c  in CNF:
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_2
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨  b^{23, 29}_1
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ -p_644 ∨ -b^{23, 29}_0
c  in DIMACS:
 14141  14142 -14143 -644 -14144 0
 14141  14142 -14143 -644  14145 0
 14141  14142 -14143 -644 -14146 0

c  2+1 --> break 
c    (-b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧  p_644) -> break
c  in CNF:
c     b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 14141 -14142  14143 -644 1162 0


c  2-1 --> 1
c    (-b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧ -p_644) -> (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0)
c  in CNF:
c     b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_2
c     b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_1
c     b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨  b^{23, 29}_0
c  in DIMACS:
 14141 -14142  14143  644 -14144 0
 14141 -14142  14143  644 -14145 0
 14141 -14142  14143  644  14146 0

c  1-1 --> 0
c    (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0 ∧ -p_644) -> (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧ -b^{23, 29}_0)
c  in CNF:
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_2
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_1
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_0
c  in DIMACS:
 14141  14142 -14143  644 -14144 0
 14141  14142 -14143  644 -14145 0
 14141  14142 -14143  644 -14146 0

c  0-1 --> -1
c    (-b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧ -p_644) -> ( b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0)
c  in CNF:
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨  b^{23, 29}_2
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_1
c     b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨  b^{23, 29}_0
c  in DIMACS:
 14141  14142  14143  644  14144 0
 14141  14142  14143  644 -14145 0
 14141  14142  14143  644  14146 0

c  -1-1 --> -2
c    ( b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧  b^{23, 28}_0 ∧ -p_644) -> ( b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0)
c  in CNF:
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨  b^{23, 29}_2
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨  b^{23, 29}_1
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨  p_644 ∨ -b^{23, 29}_0
c  in DIMACS:
-14141  14142 -14143  644  14144 0
-14141  14142 -14143  644  14145 0
-14141  14142 -14143  644 -14146 0

c  -2-1 --> break 
c    ( b^{23, 28}_2 ∧  b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨  b^{23, 28}_0 ∨  p_644 ∨ break
c  in DIMACS:
-14141 -14142  14143  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 28}_2 ∧ -b^{23, 28}_1 ∧ -b^{23, 28}_0 ∧ true) 
c  in CNF:
c    -b^{23, 28}_2 ∨  b^{23, 28}_1 ∨  b^{23, 28}_0 ∨ false 
c  in DIMACS:
-14141  14142  14143  0

c  3 does not represent an automaton state.
c    -(-b^{23, 28}_2 ∧  b^{23, 28}_1 ∧  b^{23, 28}_0 ∧ true) 
c  in CNF:
c     b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ false 
c  in DIMACS:
 14141 -14142 -14143  0
c  -3 does not represent an automaton state.
c    -( b^{23, 28}_2 ∧  b^{23, 28}_1 ∧  b^{23, 28}_0 ∧ true) 
c  in CNF:
c    -b^{23, 28}_2 ∨ -b^{23, 28}_1 ∨ -b^{23, 28}_0 ∨ false 
c  in DIMACS:
-14141 -14142 -14143  0

c i = 29
c  -2+1 --> -1
c    ( b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧  p_667) -> ( b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0)
c  in CNF:
c    -b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨  b^{23, 30}_2
c    -b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_1
c    -b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨  b^{23, 30}_0
c  in DIMACS:
-14144 -14145  14146 -667  14147 0
-14144 -14145  14146 -667 -14148 0
-14144 -14145  14146 -667  14149 0

c  -1+1 --> 0
c    ( b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0 ∧  p_667) -> (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧ -b^{23, 30}_0)
c  in CNF:
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_2
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_1
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_0
c  in DIMACS:
-14144  14145 -14146 -667 -14147 0
-14144  14145 -14146 -667 -14148 0
-14144  14145 -14146 -667 -14149 0

c  0+1 --> 1
c    (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧  p_667) -> (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0)
c  in CNF:
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_2
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_1
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨  b^{23, 30}_0
c  in DIMACS:
 14144  14145  14146 -667 -14147 0
 14144  14145  14146 -667 -14148 0
 14144  14145  14146 -667  14149 0

c  1+1 --> 2
c    (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0 ∧  p_667) -> (-b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0)
c  in CNF:
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_2
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨  b^{23, 30}_1
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ -p_667 ∨ -b^{23, 30}_0
c  in DIMACS:
 14144  14145 -14146 -667 -14147 0
 14144  14145 -14146 -667  14148 0
 14144  14145 -14146 -667 -14149 0

c  2+1 --> break 
c    (-b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧  p_667) -> break
c  in CNF:
c     b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ -p_667 ∨ break
c  in DIMACS:
 14144 -14145  14146 -667 1162 0


c  2-1 --> 1
c    (-b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧ -p_667) -> (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0)
c  in CNF:
c     b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_2
c     b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_1
c     b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨  b^{23, 30}_0
c  in DIMACS:
 14144 -14145  14146  667 -14147 0
 14144 -14145  14146  667 -14148 0
 14144 -14145  14146  667  14149 0

c  1-1 --> 0
c    (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0 ∧ -p_667) -> (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧ -b^{23, 30}_0)
c  in CNF:
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_2
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_1
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_0
c  in DIMACS:
 14144  14145 -14146  667 -14147 0
 14144  14145 -14146  667 -14148 0
 14144  14145 -14146  667 -14149 0

c  0-1 --> -1
c    (-b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧ -p_667) -> ( b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0)
c  in CNF:
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨  b^{23, 30}_2
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_1
c     b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨  b^{23, 30}_0
c  in DIMACS:
 14144  14145  14146  667  14147 0
 14144  14145  14146  667 -14148 0
 14144  14145  14146  667  14149 0

c  -1-1 --> -2
c    ( b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧  b^{23, 29}_0 ∧ -p_667) -> ( b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0)
c  in CNF:
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨  b^{23, 30}_2
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨  b^{23, 30}_1
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨  p_667 ∨ -b^{23, 30}_0
c  in DIMACS:
-14144  14145 -14146  667  14147 0
-14144  14145 -14146  667  14148 0
-14144  14145 -14146  667 -14149 0

c  -2-1 --> break 
c    ( b^{23, 29}_2 ∧  b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧ -p_667) -> break
c  in CNF:
c    -b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨  b^{23, 29}_0 ∨  p_667 ∨ break
c  in DIMACS:
-14144 -14145  14146  667 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 29}_2 ∧ -b^{23, 29}_1 ∧ -b^{23, 29}_0 ∧ true) 
c  in CNF:
c    -b^{23, 29}_2 ∨  b^{23, 29}_1 ∨  b^{23, 29}_0 ∨ false 
c  in DIMACS:
-14144  14145  14146  0

c  3 does not represent an automaton state.
c    -(-b^{23, 29}_2 ∧  b^{23, 29}_1 ∧  b^{23, 29}_0 ∧ true) 
c  in CNF:
c     b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ false 
c  in DIMACS:
 14144 -14145 -14146  0
c  -3 does not represent an automaton state.
c    -( b^{23, 29}_2 ∧  b^{23, 29}_1 ∧  b^{23, 29}_0 ∧ true) 
c  in CNF:
c    -b^{23, 29}_2 ∨ -b^{23, 29}_1 ∨ -b^{23, 29}_0 ∨ false 
c  in DIMACS:
-14144 -14145 -14146  0

c i = 30
c  -2+1 --> -1
c    ( b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧  p_690) -> ( b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0)
c  in CNF:
c    -b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨  b^{23, 31}_2
c    -b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_1
c    -b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨  b^{23, 31}_0
c  in DIMACS:
-14147 -14148  14149 -690  14150 0
-14147 -14148  14149 -690 -14151 0
-14147 -14148  14149 -690  14152 0

c  -1+1 --> 0
c    ( b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0 ∧  p_690) -> (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧ -b^{23, 31}_0)
c  in CNF:
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_2
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_1
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_0
c  in DIMACS:
-14147  14148 -14149 -690 -14150 0
-14147  14148 -14149 -690 -14151 0
-14147  14148 -14149 -690 -14152 0

c  0+1 --> 1
c    (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧  p_690) -> (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0)
c  in CNF:
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_2
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_1
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨  b^{23, 31}_0
c  in DIMACS:
 14147  14148  14149 -690 -14150 0
 14147  14148  14149 -690 -14151 0
 14147  14148  14149 -690  14152 0

c  1+1 --> 2
c    (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0 ∧  p_690) -> (-b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0)
c  in CNF:
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_2
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨  b^{23, 31}_1
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ -p_690 ∨ -b^{23, 31}_0
c  in DIMACS:
 14147  14148 -14149 -690 -14150 0
 14147  14148 -14149 -690  14151 0
 14147  14148 -14149 -690 -14152 0

c  2+1 --> break 
c    (-b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧  p_690) -> break
c  in CNF:
c     b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 14147 -14148  14149 -690 1162 0


c  2-1 --> 1
c    (-b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧ -p_690) -> (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0)
c  in CNF:
c     b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_2
c     b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_1
c     b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨  b^{23, 31}_0
c  in DIMACS:
 14147 -14148  14149  690 -14150 0
 14147 -14148  14149  690 -14151 0
 14147 -14148  14149  690  14152 0

c  1-1 --> 0
c    (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0 ∧ -p_690) -> (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧ -b^{23, 31}_0)
c  in CNF:
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_2
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_1
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_0
c  in DIMACS:
 14147  14148 -14149  690 -14150 0
 14147  14148 -14149  690 -14151 0
 14147  14148 -14149  690 -14152 0

c  0-1 --> -1
c    (-b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧ -p_690) -> ( b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0)
c  in CNF:
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨  b^{23, 31}_2
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_1
c     b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨  b^{23, 31}_0
c  in DIMACS:
 14147  14148  14149  690  14150 0
 14147  14148  14149  690 -14151 0
 14147  14148  14149  690  14152 0

c  -1-1 --> -2
c    ( b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧  b^{23, 30}_0 ∧ -p_690) -> ( b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0)
c  in CNF:
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨  b^{23, 31}_2
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨  b^{23, 31}_1
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨  p_690 ∨ -b^{23, 31}_0
c  in DIMACS:
-14147  14148 -14149  690  14150 0
-14147  14148 -14149  690  14151 0
-14147  14148 -14149  690 -14152 0

c  -2-1 --> break 
c    ( b^{23, 30}_2 ∧  b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨  b^{23, 30}_0 ∨  p_690 ∨ break
c  in DIMACS:
-14147 -14148  14149  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 30}_2 ∧ -b^{23, 30}_1 ∧ -b^{23, 30}_0 ∧ true) 
c  in CNF:
c    -b^{23, 30}_2 ∨  b^{23, 30}_1 ∨  b^{23, 30}_0 ∨ false 
c  in DIMACS:
-14147  14148  14149  0

c  3 does not represent an automaton state.
c    -(-b^{23, 30}_2 ∧  b^{23, 30}_1 ∧  b^{23, 30}_0 ∧ true) 
c  in CNF:
c     b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ false 
c  in DIMACS:
 14147 -14148 -14149  0
c  -3 does not represent an automaton state.
c    -( b^{23, 30}_2 ∧  b^{23, 30}_1 ∧  b^{23, 30}_0 ∧ true) 
c  in CNF:
c    -b^{23, 30}_2 ∨ -b^{23, 30}_1 ∨ -b^{23, 30}_0 ∨ false 
c  in DIMACS:
-14147 -14148 -14149  0

c i = 31
c  -2+1 --> -1
c    ( b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧  p_713) -> ( b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0)
c  in CNF:
c    -b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨  b^{23, 32}_2
c    -b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_1
c    -b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨  b^{23, 32}_0
c  in DIMACS:
-14150 -14151  14152 -713  14153 0
-14150 -14151  14152 -713 -14154 0
-14150 -14151  14152 -713  14155 0

c  -1+1 --> 0
c    ( b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0 ∧  p_713) -> (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧ -b^{23, 32}_0)
c  in CNF:
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_2
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_1
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_0
c  in DIMACS:
-14150  14151 -14152 -713 -14153 0
-14150  14151 -14152 -713 -14154 0
-14150  14151 -14152 -713 -14155 0

c  0+1 --> 1
c    (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧  p_713) -> (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0)
c  in CNF:
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_2
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_1
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨  b^{23, 32}_0
c  in DIMACS:
 14150  14151  14152 -713 -14153 0
 14150  14151  14152 -713 -14154 0
 14150  14151  14152 -713  14155 0

c  1+1 --> 2
c    (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0 ∧  p_713) -> (-b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0)
c  in CNF:
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_2
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨  b^{23, 32}_1
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ -p_713 ∨ -b^{23, 32}_0
c  in DIMACS:
 14150  14151 -14152 -713 -14153 0
 14150  14151 -14152 -713  14154 0
 14150  14151 -14152 -713 -14155 0

c  2+1 --> break 
c    (-b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧  p_713) -> break
c  in CNF:
c     b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ -p_713 ∨ break
c  in DIMACS:
 14150 -14151  14152 -713 1162 0


c  2-1 --> 1
c    (-b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧ -p_713) -> (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0)
c  in CNF:
c     b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_2
c     b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_1
c     b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨  b^{23, 32}_0
c  in DIMACS:
 14150 -14151  14152  713 -14153 0
 14150 -14151  14152  713 -14154 0
 14150 -14151  14152  713  14155 0

c  1-1 --> 0
c    (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0 ∧ -p_713) -> (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧ -b^{23, 32}_0)
c  in CNF:
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_2
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_1
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_0
c  in DIMACS:
 14150  14151 -14152  713 -14153 0
 14150  14151 -14152  713 -14154 0
 14150  14151 -14152  713 -14155 0

c  0-1 --> -1
c    (-b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧ -p_713) -> ( b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0)
c  in CNF:
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨  b^{23, 32}_2
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_1
c     b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨  b^{23, 32}_0
c  in DIMACS:
 14150  14151  14152  713  14153 0
 14150  14151  14152  713 -14154 0
 14150  14151  14152  713  14155 0

c  -1-1 --> -2
c    ( b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧  b^{23, 31}_0 ∧ -p_713) -> ( b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0)
c  in CNF:
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨  b^{23, 32}_2
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨  b^{23, 32}_1
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨  p_713 ∨ -b^{23, 32}_0
c  in DIMACS:
-14150  14151 -14152  713  14153 0
-14150  14151 -14152  713  14154 0
-14150  14151 -14152  713 -14155 0

c  -2-1 --> break 
c    ( b^{23, 31}_2 ∧  b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧ -p_713) -> break
c  in CNF:
c    -b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨  b^{23, 31}_0 ∨  p_713 ∨ break
c  in DIMACS:
-14150 -14151  14152  713 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 31}_2 ∧ -b^{23, 31}_1 ∧ -b^{23, 31}_0 ∧ true) 
c  in CNF:
c    -b^{23, 31}_2 ∨  b^{23, 31}_1 ∨  b^{23, 31}_0 ∨ false 
c  in DIMACS:
-14150  14151  14152  0

c  3 does not represent an automaton state.
c    -(-b^{23, 31}_2 ∧  b^{23, 31}_1 ∧  b^{23, 31}_0 ∧ true) 
c  in CNF:
c     b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ false 
c  in DIMACS:
 14150 -14151 -14152  0
c  -3 does not represent an automaton state.
c    -( b^{23, 31}_2 ∧  b^{23, 31}_1 ∧  b^{23, 31}_0 ∧ true) 
c  in CNF:
c    -b^{23, 31}_2 ∨ -b^{23, 31}_1 ∨ -b^{23, 31}_0 ∨ false 
c  in DIMACS:
-14150 -14151 -14152  0

c i = 32
c  -2+1 --> -1
c    ( b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧  p_736) -> ( b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0)
c  in CNF:
c    -b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨  b^{23, 33}_2
c    -b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_1
c    -b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨  b^{23, 33}_0
c  in DIMACS:
-14153 -14154  14155 -736  14156 0
-14153 -14154  14155 -736 -14157 0
-14153 -14154  14155 -736  14158 0

c  -1+1 --> 0
c    ( b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0 ∧  p_736) -> (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧ -b^{23, 33}_0)
c  in CNF:
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_2
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_1
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_0
c  in DIMACS:
-14153  14154 -14155 -736 -14156 0
-14153  14154 -14155 -736 -14157 0
-14153  14154 -14155 -736 -14158 0

c  0+1 --> 1
c    (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧  p_736) -> (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0)
c  in CNF:
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_2
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_1
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨  b^{23, 33}_0
c  in DIMACS:
 14153  14154  14155 -736 -14156 0
 14153  14154  14155 -736 -14157 0
 14153  14154  14155 -736  14158 0

c  1+1 --> 2
c    (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0 ∧  p_736) -> (-b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0)
c  in CNF:
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_2
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨  b^{23, 33}_1
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ -p_736 ∨ -b^{23, 33}_0
c  in DIMACS:
 14153  14154 -14155 -736 -14156 0
 14153  14154 -14155 -736  14157 0
 14153  14154 -14155 -736 -14158 0

c  2+1 --> break 
c    (-b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧  p_736) -> break
c  in CNF:
c     b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 14153 -14154  14155 -736 1162 0


c  2-1 --> 1
c    (-b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧ -p_736) -> (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0)
c  in CNF:
c     b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_2
c     b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_1
c     b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨  b^{23, 33}_0
c  in DIMACS:
 14153 -14154  14155  736 -14156 0
 14153 -14154  14155  736 -14157 0
 14153 -14154  14155  736  14158 0

c  1-1 --> 0
c    (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0 ∧ -p_736) -> (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧ -b^{23, 33}_0)
c  in CNF:
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_2
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_1
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_0
c  in DIMACS:
 14153  14154 -14155  736 -14156 0
 14153  14154 -14155  736 -14157 0
 14153  14154 -14155  736 -14158 0

c  0-1 --> -1
c    (-b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧ -p_736) -> ( b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0)
c  in CNF:
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨  b^{23, 33}_2
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_1
c     b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨  b^{23, 33}_0
c  in DIMACS:
 14153  14154  14155  736  14156 0
 14153  14154  14155  736 -14157 0
 14153  14154  14155  736  14158 0

c  -1-1 --> -2
c    ( b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧  b^{23, 32}_0 ∧ -p_736) -> ( b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0)
c  in CNF:
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨  b^{23, 33}_2
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨  b^{23, 33}_1
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨  p_736 ∨ -b^{23, 33}_0
c  in DIMACS:
-14153  14154 -14155  736  14156 0
-14153  14154 -14155  736  14157 0
-14153  14154 -14155  736 -14158 0

c  -2-1 --> break 
c    ( b^{23, 32}_2 ∧  b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨  b^{23, 32}_0 ∨  p_736 ∨ break
c  in DIMACS:
-14153 -14154  14155  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 32}_2 ∧ -b^{23, 32}_1 ∧ -b^{23, 32}_0 ∧ true) 
c  in CNF:
c    -b^{23, 32}_2 ∨  b^{23, 32}_1 ∨  b^{23, 32}_0 ∨ false 
c  in DIMACS:
-14153  14154  14155  0

c  3 does not represent an automaton state.
c    -(-b^{23, 32}_2 ∧  b^{23, 32}_1 ∧  b^{23, 32}_0 ∧ true) 
c  in CNF:
c     b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ false 
c  in DIMACS:
 14153 -14154 -14155  0
c  -3 does not represent an automaton state.
c    -( b^{23, 32}_2 ∧  b^{23, 32}_1 ∧  b^{23, 32}_0 ∧ true) 
c  in CNF:
c    -b^{23, 32}_2 ∨ -b^{23, 32}_1 ∨ -b^{23, 32}_0 ∨ false 
c  in DIMACS:
-14153 -14154 -14155  0

c i = 33
c  -2+1 --> -1
c    ( b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧  p_759) -> ( b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0)
c  in CNF:
c    -b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨  b^{23, 34}_2
c    -b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_1
c    -b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨  b^{23, 34}_0
c  in DIMACS:
-14156 -14157  14158 -759  14159 0
-14156 -14157  14158 -759 -14160 0
-14156 -14157  14158 -759  14161 0

c  -1+1 --> 0
c    ( b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0 ∧  p_759) -> (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧ -b^{23, 34}_0)
c  in CNF:
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_2
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_1
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_0
c  in DIMACS:
-14156  14157 -14158 -759 -14159 0
-14156  14157 -14158 -759 -14160 0
-14156  14157 -14158 -759 -14161 0

c  0+1 --> 1
c    (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧  p_759) -> (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0)
c  in CNF:
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_2
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_1
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨  b^{23, 34}_0
c  in DIMACS:
 14156  14157  14158 -759 -14159 0
 14156  14157  14158 -759 -14160 0
 14156  14157  14158 -759  14161 0

c  1+1 --> 2
c    (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0 ∧  p_759) -> (-b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0)
c  in CNF:
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_2
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨  b^{23, 34}_1
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ -p_759 ∨ -b^{23, 34}_0
c  in DIMACS:
 14156  14157 -14158 -759 -14159 0
 14156  14157 -14158 -759  14160 0
 14156  14157 -14158 -759 -14161 0

c  2+1 --> break 
c    (-b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧  p_759) -> break
c  in CNF:
c     b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 14156 -14157  14158 -759 1162 0


c  2-1 --> 1
c    (-b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧ -p_759) -> (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0)
c  in CNF:
c     b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_2
c     b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_1
c     b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨  b^{23, 34}_0
c  in DIMACS:
 14156 -14157  14158  759 -14159 0
 14156 -14157  14158  759 -14160 0
 14156 -14157  14158  759  14161 0

c  1-1 --> 0
c    (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0 ∧ -p_759) -> (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧ -b^{23, 34}_0)
c  in CNF:
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_2
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_1
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_0
c  in DIMACS:
 14156  14157 -14158  759 -14159 0
 14156  14157 -14158  759 -14160 0
 14156  14157 -14158  759 -14161 0

c  0-1 --> -1
c    (-b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧ -p_759) -> ( b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0)
c  in CNF:
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨  b^{23, 34}_2
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_1
c     b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨  b^{23, 34}_0
c  in DIMACS:
 14156  14157  14158  759  14159 0
 14156  14157  14158  759 -14160 0
 14156  14157  14158  759  14161 0

c  -1-1 --> -2
c    ( b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧  b^{23, 33}_0 ∧ -p_759) -> ( b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0)
c  in CNF:
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨  b^{23, 34}_2
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨  b^{23, 34}_1
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨  p_759 ∨ -b^{23, 34}_0
c  in DIMACS:
-14156  14157 -14158  759  14159 0
-14156  14157 -14158  759  14160 0
-14156  14157 -14158  759 -14161 0

c  -2-1 --> break 
c    ( b^{23, 33}_2 ∧  b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨  b^{23, 33}_0 ∨  p_759 ∨ break
c  in DIMACS:
-14156 -14157  14158  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 33}_2 ∧ -b^{23, 33}_1 ∧ -b^{23, 33}_0 ∧ true) 
c  in CNF:
c    -b^{23, 33}_2 ∨  b^{23, 33}_1 ∨  b^{23, 33}_0 ∨ false 
c  in DIMACS:
-14156  14157  14158  0

c  3 does not represent an automaton state.
c    -(-b^{23, 33}_2 ∧  b^{23, 33}_1 ∧  b^{23, 33}_0 ∧ true) 
c  in CNF:
c     b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ false 
c  in DIMACS:
 14156 -14157 -14158  0
c  -3 does not represent an automaton state.
c    -( b^{23, 33}_2 ∧  b^{23, 33}_1 ∧  b^{23, 33}_0 ∧ true) 
c  in CNF:
c    -b^{23, 33}_2 ∨ -b^{23, 33}_1 ∨ -b^{23, 33}_0 ∨ false 
c  in DIMACS:
-14156 -14157 -14158  0

c i = 34
c  -2+1 --> -1
c    ( b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧  p_782) -> ( b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0)
c  in CNF:
c    -b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨  b^{23, 35}_2
c    -b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_1
c    -b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨  b^{23, 35}_0
c  in DIMACS:
-14159 -14160  14161 -782  14162 0
-14159 -14160  14161 -782 -14163 0
-14159 -14160  14161 -782  14164 0

c  -1+1 --> 0
c    ( b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0 ∧  p_782) -> (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧ -b^{23, 35}_0)
c  in CNF:
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_2
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_1
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_0
c  in DIMACS:
-14159  14160 -14161 -782 -14162 0
-14159  14160 -14161 -782 -14163 0
-14159  14160 -14161 -782 -14164 0

c  0+1 --> 1
c    (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧  p_782) -> (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0)
c  in CNF:
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_2
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_1
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨  b^{23, 35}_0
c  in DIMACS:
 14159  14160  14161 -782 -14162 0
 14159  14160  14161 -782 -14163 0
 14159  14160  14161 -782  14164 0

c  1+1 --> 2
c    (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0 ∧  p_782) -> (-b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0)
c  in CNF:
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_2
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨  b^{23, 35}_1
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ -p_782 ∨ -b^{23, 35}_0
c  in DIMACS:
 14159  14160 -14161 -782 -14162 0
 14159  14160 -14161 -782  14163 0
 14159  14160 -14161 -782 -14164 0

c  2+1 --> break 
c    (-b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧  p_782) -> break
c  in CNF:
c     b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 14159 -14160  14161 -782 1162 0


c  2-1 --> 1
c    (-b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧ -p_782) -> (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0)
c  in CNF:
c     b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_2
c     b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_1
c     b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨  b^{23, 35}_0
c  in DIMACS:
 14159 -14160  14161  782 -14162 0
 14159 -14160  14161  782 -14163 0
 14159 -14160  14161  782  14164 0

c  1-1 --> 0
c    (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0 ∧ -p_782) -> (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧ -b^{23, 35}_0)
c  in CNF:
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_2
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_1
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_0
c  in DIMACS:
 14159  14160 -14161  782 -14162 0
 14159  14160 -14161  782 -14163 0
 14159  14160 -14161  782 -14164 0

c  0-1 --> -1
c    (-b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧ -p_782) -> ( b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0)
c  in CNF:
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨  b^{23, 35}_2
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_1
c     b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨  b^{23, 35}_0
c  in DIMACS:
 14159  14160  14161  782  14162 0
 14159  14160  14161  782 -14163 0
 14159  14160  14161  782  14164 0

c  -1-1 --> -2
c    ( b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧  b^{23, 34}_0 ∧ -p_782) -> ( b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0)
c  in CNF:
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨  b^{23, 35}_2
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨  b^{23, 35}_1
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨  p_782 ∨ -b^{23, 35}_0
c  in DIMACS:
-14159  14160 -14161  782  14162 0
-14159  14160 -14161  782  14163 0
-14159  14160 -14161  782 -14164 0

c  -2-1 --> break 
c    ( b^{23, 34}_2 ∧  b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨  b^{23, 34}_0 ∨  p_782 ∨ break
c  in DIMACS:
-14159 -14160  14161  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 34}_2 ∧ -b^{23, 34}_1 ∧ -b^{23, 34}_0 ∧ true) 
c  in CNF:
c    -b^{23, 34}_2 ∨  b^{23, 34}_1 ∨  b^{23, 34}_0 ∨ false 
c  in DIMACS:
-14159  14160  14161  0

c  3 does not represent an automaton state.
c    -(-b^{23, 34}_2 ∧  b^{23, 34}_1 ∧  b^{23, 34}_0 ∧ true) 
c  in CNF:
c     b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ false 
c  in DIMACS:
 14159 -14160 -14161  0
c  -3 does not represent an automaton state.
c    -( b^{23, 34}_2 ∧  b^{23, 34}_1 ∧  b^{23, 34}_0 ∧ true) 
c  in CNF:
c    -b^{23, 34}_2 ∨ -b^{23, 34}_1 ∨ -b^{23, 34}_0 ∨ false 
c  in DIMACS:
-14159 -14160 -14161  0

c i = 35
c  -2+1 --> -1
c    ( b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧  p_805) -> ( b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0)
c  in CNF:
c    -b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨  b^{23, 36}_2
c    -b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_1
c    -b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨  b^{23, 36}_0
c  in DIMACS:
-14162 -14163  14164 -805  14165 0
-14162 -14163  14164 -805 -14166 0
-14162 -14163  14164 -805  14167 0

c  -1+1 --> 0
c    ( b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0 ∧  p_805) -> (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧ -b^{23, 36}_0)
c  in CNF:
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_2
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_1
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_0
c  in DIMACS:
-14162  14163 -14164 -805 -14165 0
-14162  14163 -14164 -805 -14166 0
-14162  14163 -14164 -805 -14167 0

c  0+1 --> 1
c    (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧  p_805) -> (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0)
c  in CNF:
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_2
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_1
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨  b^{23, 36}_0
c  in DIMACS:
 14162  14163  14164 -805 -14165 0
 14162  14163  14164 -805 -14166 0
 14162  14163  14164 -805  14167 0

c  1+1 --> 2
c    (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0 ∧  p_805) -> (-b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0)
c  in CNF:
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_2
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨  b^{23, 36}_1
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ -p_805 ∨ -b^{23, 36}_0
c  in DIMACS:
 14162  14163 -14164 -805 -14165 0
 14162  14163 -14164 -805  14166 0
 14162  14163 -14164 -805 -14167 0

c  2+1 --> break 
c    (-b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧  p_805) -> break
c  in CNF:
c     b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 14162 -14163  14164 -805 1162 0


c  2-1 --> 1
c    (-b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧ -p_805) -> (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0)
c  in CNF:
c     b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_2
c     b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_1
c     b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨  b^{23, 36}_0
c  in DIMACS:
 14162 -14163  14164  805 -14165 0
 14162 -14163  14164  805 -14166 0
 14162 -14163  14164  805  14167 0

c  1-1 --> 0
c    (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0 ∧ -p_805) -> (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧ -b^{23, 36}_0)
c  in CNF:
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_2
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_1
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_0
c  in DIMACS:
 14162  14163 -14164  805 -14165 0
 14162  14163 -14164  805 -14166 0
 14162  14163 -14164  805 -14167 0

c  0-1 --> -1
c    (-b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧ -p_805) -> ( b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0)
c  in CNF:
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨  b^{23, 36}_2
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_1
c     b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨  b^{23, 36}_0
c  in DIMACS:
 14162  14163  14164  805  14165 0
 14162  14163  14164  805 -14166 0
 14162  14163  14164  805  14167 0

c  -1-1 --> -2
c    ( b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧  b^{23, 35}_0 ∧ -p_805) -> ( b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0)
c  in CNF:
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨  b^{23, 36}_2
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨  b^{23, 36}_1
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨  p_805 ∨ -b^{23, 36}_0
c  in DIMACS:
-14162  14163 -14164  805  14165 0
-14162  14163 -14164  805  14166 0
-14162  14163 -14164  805 -14167 0

c  -2-1 --> break 
c    ( b^{23, 35}_2 ∧  b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨  b^{23, 35}_0 ∨  p_805 ∨ break
c  in DIMACS:
-14162 -14163  14164  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 35}_2 ∧ -b^{23, 35}_1 ∧ -b^{23, 35}_0 ∧ true) 
c  in CNF:
c    -b^{23, 35}_2 ∨  b^{23, 35}_1 ∨  b^{23, 35}_0 ∨ false 
c  in DIMACS:
-14162  14163  14164  0

c  3 does not represent an automaton state.
c    -(-b^{23, 35}_2 ∧  b^{23, 35}_1 ∧  b^{23, 35}_0 ∧ true) 
c  in CNF:
c     b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ false 
c  in DIMACS:
 14162 -14163 -14164  0
c  -3 does not represent an automaton state.
c    -( b^{23, 35}_2 ∧  b^{23, 35}_1 ∧  b^{23, 35}_0 ∧ true) 
c  in CNF:
c    -b^{23, 35}_2 ∨ -b^{23, 35}_1 ∨ -b^{23, 35}_0 ∨ false 
c  in DIMACS:
-14162 -14163 -14164  0

c i = 36
c  -2+1 --> -1
c    ( b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧  p_828) -> ( b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0)
c  in CNF:
c    -b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨  b^{23, 37}_2
c    -b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_1
c    -b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨  b^{23, 37}_0
c  in DIMACS:
-14165 -14166  14167 -828  14168 0
-14165 -14166  14167 -828 -14169 0
-14165 -14166  14167 -828  14170 0

c  -1+1 --> 0
c    ( b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0 ∧  p_828) -> (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧ -b^{23, 37}_0)
c  in CNF:
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_2
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_1
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_0
c  in DIMACS:
-14165  14166 -14167 -828 -14168 0
-14165  14166 -14167 -828 -14169 0
-14165  14166 -14167 -828 -14170 0

c  0+1 --> 1
c    (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧  p_828) -> (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0)
c  in CNF:
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_2
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_1
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨  b^{23, 37}_0
c  in DIMACS:
 14165  14166  14167 -828 -14168 0
 14165  14166  14167 -828 -14169 0
 14165  14166  14167 -828  14170 0

c  1+1 --> 2
c    (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0 ∧  p_828) -> (-b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0)
c  in CNF:
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_2
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨  b^{23, 37}_1
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ -p_828 ∨ -b^{23, 37}_0
c  in DIMACS:
 14165  14166 -14167 -828 -14168 0
 14165  14166 -14167 -828  14169 0
 14165  14166 -14167 -828 -14170 0

c  2+1 --> break 
c    (-b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧  p_828) -> break
c  in CNF:
c     b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 14165 -14166  14167 -828 1162 0


c  2-1 --> 1
c    (-b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧ -p_828) -> (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0)
c  in CNF:
c     b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_2
c     b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_1
c     b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨  b^{23, 37}_0
c  in DIMACS:
 14165 -14166  14167  828 -14168 0
 14165 -14166  14167  828 -14169 0
 14165 -14166  14167  828  14170 0

c  1-1 --> 0
c    (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0 ∧ -p_828) -> (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧ -b^{23, 37}_0)
c  in CNF:
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_2
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_1
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_0
c  in DIMACS:
 14165  14166 -14167  828 -14168 0
 14165  14166 -14167  828 -14169 0
 14165  14166 -14167  828 -14170 0

c  0-1 --> -1
c    (-b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧ -p_828) -> ( b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0)
c  in CNF:
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨  b^{23, 37}_2
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_1
c     b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨  b^{23, 37}_0
c  in DIMACS:
 14165  14166  14167  828  14168 0
 14165  14166  14167  828 -14169 0
 14165  14166  14167  828  14170 0

c  -1-1 --> -2
c    ( b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧  b^{23, 36}_0 ∧ -p_828) -> ( b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0)
c  in CNF:
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨  b^{23, 37}_2
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨  b^{23, 37}_1
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨  p_828 ∨ -b^{23, 37}_0
c  in DIMACS:
-14165  14166 -14167  828  14168 0
-14165  14166 -14167  828  14169 0
-14165  14166 -14167  828 -14170 0

c  -2-1 --> break 
c    ( b^{23, 36}_2 ∧  b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨  b^{23, 36}_0 ∨  p_828 ∨ break
c  in DIMACS:
-14165 -14166  14167  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 36}_2 ∧ -b^{23, 36}_1 ∧ -b^{23, 36}_0 ∧ true) 
c  in CNF:
c    -b^{23, 36}_2 ∨  b^{23, 36}_1 ∨  b^{23, 36}_0 ∨ false 
c  in DIMACS:
-14165  14166  14167  0

c  3 does not represent an automaton state.
c    -(-b^{23, 36}_2 ∧  b^{23, 36}_1 ∧  b^{23, 36}_0 ∧ true) 
c  in CNF:
c     b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ false 
c  in DIMACS:
 14165 -14166 -14167  0
c  -3 does not represent an automaton state.
c    -( b^{23, 36}_2 ∧  b^{23, 36}_1 ∧  b^{23, 36}_0 ∧ true) 
c  in CNF:
c    -b^{23, 36}_2 ∨ -b^{23, 36}_1 ∨ -b^{23, 36}_0 ∨ false 
c  in DIMACS:
-14165 -14166 -14167  0

c i = 37
c  -2+1 --> -1
c    ( b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧  p_851) -> ( b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0)
c  in CNF:
c    -b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨  b^{23, 38}_2
c    -b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_1
c    -b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨  b^{23, 38}_0
c  in DIMACS:
-14168 -14169  14170 -851  14171 0
-14168 -14169  14170 -851 -14172 0
-14168 -14169  14170 -851  14173 0

c  -1+1 --> 0
c    ( b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0 ∧  p_851) -> (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧ -b^{23, 38}_0)
c  in CNF:
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_2
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_1
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_0
c  in DIMACS:
-14168  14169 -14170 -851 -14171 0
-14168  14169 -14170 -851 -14172 0
-14168  14169 -14170 -851 -14173 0

c  0+1 --> 1
c    (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧  p_851) -> (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0)
c  in CNF:
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_2
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_1
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨  b^{23, 38}_0
c  in DIMACS:
 14168  14169  14170 -851 -14171 0
 14168  14169  14170 -851 -14172 0
 14168  14169  14170 -851  14173 0

c  1+1 --> 2
c    (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0 ∧  p_851) -> (-b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0)
c  in CNF:
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_2
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨  b^{23, 38}_1
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ -p_851 ∨ -b^{23, 38}_0
c  in DIMACS:
 14168  14169 -14170 -851 -14171 0
 14168  14169 -14170 -851  14172 0
 14168  14169 -14170 -851 -14173 0

c  2+1 --> break 
c    (-b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧  p_851) -> break
c  in CNF:
c     b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ -p_851 ∨ break
c  in DIMACS:
 14168 -14169  14170 -851 1162 0


c  2-1 --> 1
c    (-b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧ -p_851) -> (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0)
c  in CNF:
c     b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_2
c     b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_1
c     b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨  b^{23, 38}_0
c  in DIMACS:
 14168 -14169  14170  851 -14171 0
 14168 -14169  14170  851 -14172 0
 14168 -14169  14170  851  14173 0

c  1-1 --> 0
c    (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0 ∧ -p_851) -> (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧ -b^{23, 38}_0)
c  in CNF:
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_2
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_1
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_0
c  in DIMACS:
 14168  14169 -14170  851 -14171 0
 14168  14169 -14170  851 -14172 0
 14168  14169 -14170  851 -14173 0

c  0-1 --> -1
c    (-b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧ -p_851) -> ( b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0)
c  in CNF:
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨  b^{23, 38}_2
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_1
c     b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨  b^{23, 38}_0
c  in DIMACS:
 14168  14169  14170  851  14171 0
 14168  14169  14170  851 -14172 0
 14168  14169  14170  851  14173 0

c  -1-1 --> -2
c    ( b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧  b^{23, 37}_0 ∧ -p_851) -> ( b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0)
c  in CNF:
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨  b^{23, 38}_2
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨  b^{23, 38}_1
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨  p_851 ∨ -b^{23, 38}_0
c  in DIMACS:
-14168  14169 -14170  851  14171 0
-14168  14169 -14170  851  14172 0
-14168  14169 -14170  851 -14173 0

c  -2-1 --> break 
c    ( b^{23, 37}_2 ∧  b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧ -p_851) -> break
c  in CNF:
c    -b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨  b^{23, 37}_0 ∨  p_851 ∨ break
c  in DIMACS:
-14168 -14169  14170  851 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 37}_2 ∧ -b^{23, 37}_1 ∧ -b^{23, 37}_0 ∧ true) 
c  in CNF:
c    -b^{23, 37}_2 ∨  b^{23, 37}_1 ∨  b^{23, 37}_0 ∨ false 
c  in DIMACS:
-14168  14169  14170  0

c  3 does not represent an automaton state.
c    -(-b^{23, 37}_2 ∧  b^{23, 37}_1 ∧  b^{23, 37}_0 ∧ true) 
c  in CNF:
c     b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ false 
c  in DIMACS:
 14168 -14169 -14170  0
c  -3 does not represent an automaton state.
c    -( b^{23, 37}_2 ∧  b^{23, 37}_1 ∧  b^{23, 37}_0 ∧ true) 
c  in CNF:
c    -b^{23, 37}_2 ∨ -b^{23, 37}_1 ∨ -b^{23, 37}_0 ∨ false 
c  in DIMACS:
-14168 -14169 -14170  0

c i = 38
c  -2+1 --> -1
c    ( b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧  p_874) -> ( b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0)
c  in CNF:
c    -b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨  b^{23, 39}_2
c    -b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_1
c    -b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨  b^{23, 39}_0
c  in DIMACS:
-14171 -14172  14173 -874  14174 0
-14171 -14172  14173 -874 -14175 0
-14171 -14172  14173 -874  14176 0

c  -1+1 --> 0
c    ( b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0 ∧  p_874) -> (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧ -b^{23, 39}_0)
c  in CNF:
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_2
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_1
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_0
c  in DIMACS:
-14171  14172 -14173 -874 -14174 0
-14171  14172 -14173 -874 -14175 0
-14171  14172 -14173 -874 -14176 0

c  0+1 --> 1
c    (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧  p_874) -> (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0)
c  in CNF:
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_2
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_1
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨  b^{23, 39}_0
c  in DIMACS:
 14171  14172  14173 -874 -14174 0
 14171  14172  14173 -874 -14175 0
 14171  14172  14173 -874  14176 0

c  1+1 --> 2
c    (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0 ∧  p_874) -> (-b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0)
c  in CNF:
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_2
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨  b^{23, 39}_1
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ -p_874 ∨ -b^{23, 39}_0
c  in DIMACS:
 14171  14172 -14173 -874 -14174 0
 14171  14172 -14173 -874  14175 0
 14171  14172 -14173 -874 -14176 0

c  2+1 --> break 
c    (-b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧  p_874) -> break
c  in CNF:
c     b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 14171 -14172  14173 -874 1162 0


c  2-1 --> 1
c    (-b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧ -p_874) -> (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0)
c  in CNF:
c     b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_2
c     b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_1
c     b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨  b^{23, 39}_0
c  in DIMACS:
 14171 -14172  14173  874 -14174 0
 14171 -14172  14173  874 -14175 0
 14171 -14172  14173  874  14176 0

c  1-1 --> 0
c    (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0 ∧ -p_874) -> (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧ -b^{23, 39}_0)
c  in CNF:
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_2
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_1
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_0
c  in DIMACS:
 14171  14172 -14173  874 -14174 0
 14171  14172 -14173  874 -14175 0
 14171  14172 -14173  874 -14176 0

c  0-1 --> -1
c    (-b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧ -p_874) -> ( b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0)
c  in CNF:
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨  b^{23, 39}_2
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_1
c     b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨  b^{23, 39}_0
c  in DIMACS:
 14171  14172  14173  874  14174 0
 14171  14172  14173  874 -14175 0
 14171  14172  14173  874  14176 0

c  -1-1 --> -2
c    ( b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧  b^{23, 38}_0 ∧ -p_874) -> ( b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0)
c  in CNF:
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨  b^{23, 39}_2
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨  b^{23, 39}_1
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨  p_874 ∨ -b^{23, 39}_0
c  in DIMACS:
-14171  14172 -14173  874  14174 0
-14171  14172 -14173  874  14175 0
-14171  14172 -14173  874 -14176 0

c  -2-1 --> break 
c    ( b^{23, 38}_2 ∧  b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨  b^{23, 38}_0 ∨  p_874 ∨ break
c  in DIMACS:
-14171 -14172  14173  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 38}_2 ∧ -b^{23, 38}_1 ∧ -b^{23, 38}_0 ∧ true) 
c  in CNF:
c    -b^{23, 38}_2 ∨  b^{23, 38}_1 ∨  b^{23, 38}_0 ∨ false 
c  in DIMACS:
-14171  14172  14173  0

c  3 does not represent an automaton state.
c    -(-b^{23, 38}_2 ∧  b^{23, 38}_1 ∧  b^{23, 38}_0 ∧ true) 
c  in CNF:
c     b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ false 
c  in DIMACS:
 14171 -14172 -14173  0
c  -3 does not represent an automaton state.
c    -( b^{23, 38}_2 ∧  b^{23, 38}_1 ∧  b^{23, 38}_0 ∧ true) 
c  in CNF:
c    -b^{23, 38}_2 ∨ -b^{23, 38}_1 ∨ -b^{23, 38}_0 ∨ false 
c  in DIMACS:
-14171 -14172 -14173  0

c i = 39
c  -2+1 --> -1
c    ( b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧  p_897) -> ( b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0)
c  in CNF:
c    -b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨  b^{23, 40}_2
c    -b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_1
c    -b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨  b^{23, 40}_0
c  in DIMACS:
-14174 -14175  14176 -897  14177 0
-14174 -14175  14176 -897 -14178 0
-14174 -14175  14176 -897  14179 0

c  -1+1 --> 0
c    ( b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0 ∧  p_897) -> (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧ -b^{23, 40}_0)
c  in CNF:
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_2
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_1
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_0
c  in DIMACS:
-14174  14175 -14176 -897 -14177 0
-14174  14175 -14176 -897 -14178 0
-14174  14175 -14176 -897 -14179 0

c  0+1 --> 1
c    (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧  p_897) -> (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0)
c  in CNF:
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_2
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_1
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨  b^{23, 40}_0
c  in DIMACS:
 14174  14175  14176 -897 -14177 0
 14174  14175  14176 -897 -14178 0
 14174  14175  14176 -897  14179 0

c  1+1 --> 2
c    (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0 ∧  p_897) -> (-b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0)
c  in CNF:
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_2
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨  b^{23, 40}_1
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ -p_897 ∨ -b^{23, 40}_0
c  in DIMACS:
 14174  14175 -14176 -897 -14177 0
 14174  14175 -14176 -897  14178 0
 14174  14175 -14176 -897 -14179 0

c  2+1 --> break 
c    (-b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧  p_897) -> break
c  in CNF:
c     b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 14174 -14175  14176 -897 1162 0


c  2-1 --> 1
c    (-b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧ -p_897) -> (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0)
c  in CNF:
c     b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_2
c     b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_1
c     b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨  b^{23, 40}_0
c  in DIMACS:
 14174 -14175  14176  897 -14177 0
 14174 -14175  14176  897 -14178 0
 14174 -14175  14176  897  14179 0

c  1-1 --> 0
c    (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0 ∧ -p_897) -> (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧ -b^{23, 40}_0)
c  in CNF:
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_2
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_1
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_0
c  in DIMACS:
 14174  14175 -14176  897 -14177 0
 14174  14175 -14176  897 -14178 0
 14174  14175 -14176  897 -14179 0

c  0-1 --> -1
c    (-b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧ -p_897) -> ( b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0)
c  in CNF:
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨  b^{23, 40}_2
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_1
c     b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨  b^{23, 40}_0
c  in DIMACS:
 14174  14175  14176  897  14177 0
 14174  14175  14176  897 -14178 0
 14174  14175  14176  897  14179 0

c  -1-1 --> -2
c    ( b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧  b^{23, 39}_0 ∧ -p_897) -> ( b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0)
c  in CNF:
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨  b^{23, 40}_2
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨  b^{23, 40}_1
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨  p_897 ∨ -b^{23, 40}_0
c  in DIMACS:
-14174  14175 -14176  897  14177 0
-14174  14175 -14176  897  14178 0
-14174  14175 -14176  897 -14179 0

c  -2-1 --> break 
c    ( b^{23, 39}_2 ∧  b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨  b^{23, 39}_0 ∨  p_897 ∨ break
c  in DIMACS:
-14174 -14175  14176  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 39}_2 ∧ -b^{23, 39}_1 ∧ -b^{23, 39}_0 ∧ true) 
c  in CNF:
c    -b^{23, 39}_2 ∨  b^{23, 39}_1 ∨  b^{23, 39}_0 ∨ false 
c  in DIMACS:
-14174  14175  14176  0

c  3 does not represent an automaton state.
c    -(-b^{23, 39}_2 ∧  b^{23, 39}_1 ∧  b^{23, 39}_0 ∧ true) 
c  in CNF:
c     b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ false 
c  in DIMACS:
 14174 -14175 -14176  0
c  -3 does not represent an automaton state.
c    -( b^{23, 39}_2 ∧  b^{23, 39}_1 ∧  b^{23, 39}_0 ∧ true) 
c  in CNF:
c    -b^{23, 39}_2 ∨ -b^{23, 39}_1 ∨ -b^{23, 39}_0 ∨ false 
c  in DIMACS:
-14174 -14175 -14176  0

c i = 40
c  -2+1 --> -1
c    ( b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧  p_920) -> ( b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0)
c  in CNF:
c    -b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨  b^{23, 41}_2
c    -b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_1
c    -b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨  b^{23, 41}_0
c  in DIMACS:
-14177 -14178  14179 -920  14180 0
-14177 -14178  14179 -920 -14181 0
-14177 -14178  14179 -920  14182 0

c  -1+1 --> 0
c    ( b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0 ∧  p_920) -> (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧ -b^{23, 41}_0)
c  in CNF:
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_2
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_1
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_0
c  in DIMACS:
-14177  14178 -14179 -920 -14180 0
-14177  14178 -14179 -920 -14181 0
-14177  14178 -14179 -920 -14182 0

c  0+1 --> 1
c    (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧  p_920) -> (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0)
c  in CNF:
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_2
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_1
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨  b^{23, 41}_0
c  in DIMACS:
 14177  14178  14179 -920 -14180 0
 14177  14178  14179 -920 -14181 0
 14177  14178  14179 -920  14182 0

c  1+1 --> 2
c    (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0 ∧  p_920) -> (-b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0)
c  in CNF:
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_2
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨  b^{23, 41}_1
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ -p_920 ∨ -b^{23, 41}_0
c  in DIMACS:
 14177  14178 -14179 -920 -14180 0
 14177  14178 -14179 -920  14181 0
 14177  14178 -14179 -920 -14182 0

c  2+1 --> break 
c    (-b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧  p_920) -> break
c  in CNF:
c     b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 14177 -14178  14179 -920 1162 0


c  2-1 --> 1
c    (-b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧ -p_920) -> (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0)
c  in CNF:
c     b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_2
c     b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_1
c     b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨  b^{23, 41}_0
c  in DIMACS:
 14177 -14178  14179  920 -14180 0
 14177 -14178  14179  920 -14181 0
 14177 -14178  14179  920  14182 0

c  1-1 --> 0
c    (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0 ∧ -p_920) -> (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧ -b^{23, 41}_0)
c  in CNF:
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_2
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_1
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_0
c  in DIMACS:
 14177  14178 -14179  920 -14180 0
 14177  14178 -14179  920 -14181 0
 14177  14178 -14179  920 -14182 0

c  0-1 --> -1
c    (-b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧ -p_920) -> ( b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0)
c  in CNF:
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨  b^{23, 41}_2
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_1
c     b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨  b^{23, 41}_0
c  in DIMACS:
 14177  14178  14179  920  14180 0
 14177  14178  14179  920 -14181 0
 14177  14178  14179  920  14182 0

c  -1-1 --> -2
c    ( b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧  b^{23, 40}_0 ∧ -p_920) -> ( b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0)
c  in CNF:
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨  b^{23, 41}_2
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨  b^{23, 41}_1
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨  p_920 ∨ -b^{23, 41}_0
c  in DIMACS:
-14177  14178 -14179  920  14180 0
-14177  14178 -14179  920  14181 0
-14177  14178 -14179  920 -14182 0

c  -2-1 --> break 
c    ( b^{23, 40}_2 ∧  b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨  b^{23, 40}_0 ∨  p_920 ∨ break
c  in DIMACS:
-14177 -14178  14179  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 40}_2 ∧ -b^{23, 40}_1 ∧ -b^{23, 40}_0 ∧ true) 
c  in CNF:
c    -b^{23, 40}_2 ∨  b^{23, 40}_1 ∨  b^{23, 40}_0 ∨ false 
c  in DIMACS:
-14177  14178  14179  0

c  3 does not represent an automaton state.
c    -(-b^{23, 40}_2 ∧  b^{23, 40}_1 ∧  b^{23, 40}_0 ∧ true) 
c  in CNF:
c     b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ false 
c  in DIMACS:
 14177 -14178 -14179  0
c  -3 does not represent an automaton state.
c    -( b^{23, 40}_2 ∧  b^{23, 40}_1 ∧  b^{23, 40}_0 ∧ true) 
c  in CNF:
c    -b^{23, 40}_2 ∨ -b^{23, 40}_1 ∨ -b^{23, 40}_0 ∨ false 
c  in DIMACS:
-14177 -14178 -14179  0

c i = 41
c  -2+1 --> -1
c    ( b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧  p_943) -> ( b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0)
c  in CNF:
c    -b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨  b^{23, 42}_2
c    -b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_1
c    -b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨  b^{23, 42}_0
c  in DIMACS:
-14180 -14181  14182 -943  14183 0
-14180 -14181  14182 -943 -14184 0
-14180 -14181  14182 -943  14185 0

c  -1+1 --> 0
c    ( b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0 ∧  p_943) -> (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧ -b^{23, 42}_0)
c  in CNF:
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_2
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_1
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_0
c  in DIMACS:
-14180  14181 -14182 -943 -14183 0
-14180  14181 -14182 -943 -14184 0
-14180  14181 -14182 -943 -14185 0

c  0+1 --> 1
c    (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧  p_943) -> (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0)
c  in CNF:
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_2
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_1
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨  b^{23, 42}_0
c  in DIMACS:
 14180  14181  14182 -943 -14183 0
 14180  14181  14182 -943 -14184 0
 14180  14181  14182 -943  14185 0

c  1+1 --> 2
c    (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0 ∧  p_943) -> (-b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0)
c  in CNF:
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_2
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨  b^{23, 42}_1
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ -p_943 ∨ -b^{23, 42}_0
c  in DIMACS:
 14180  14181 -14182 -943 -14183 0
 14180  14181 -14182 -943  14184 0
 14180  14181 -14182 -943 -14185 0

c  2+1 --> break 
c    (-b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧  p_943) -> break
c  in CNF:
c     b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ -p_943 ∨ break
c  in DIMACS:
 14180 -14181  14182 -943 1162 0


c  2-1 --> 1
c    (-b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧ -p_943) -> (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0)
c  in CNF:
c     b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_2
c     b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_1
c     b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨  b^{23, 42}_0
c  in DIMACS:
 14180 -14181  14182  943 -14183 0
 14180 -14181  14182  943 -14184 0
 14180 -14181  14182  943  14185 0

c  1-1 --> 0
c    (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0 ∧ -p_943) -> (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧ -b^{23, 42}_0)
c  in CNF:
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_2
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_1
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_0
c  in DIMACS:
 14180  14181 -14182  943 -14183 0
 14180  14181 -14182  943 -14184 0
 14180  14181 -14182  943 -14185 0

c  0-1 --> -1
c    (-b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧ -p_943) -> ( b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0)
c  in CNF:
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨  b^{23, 42}_2
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_1
c     b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨  b^{23, 42}_0
c  in DIMACS:
 14180  14181  14182  943  14183 0
 14180  14181  14182  943 -14184 0
 14180  14181  14182  943  14185 0

c  -1-1 --> -2
c    ( b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧  b^{23, 41}_0 ∧ -p_943) -> ( b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0)
c  in CNF:
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨  b^{23, 42}_2
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨  b^{23, 42}_1
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨  p_943 ∨ -b^{23, 42}_0
c  in DIMACS:
-14180  14181 -14182  943  14183 0
-14180  14181 -14182  943  14184 0
-14180  14181 -14182  943 -14185 0

c  -2-1 --> break 
c    ( b^{23, 41}_2 ∧  b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧ -p_943) -> break
c  in CNF:
c    -b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨  b^{23, 41}_0 ∨  p_943 ∨ break
c  in DIMACS:
-14180 -14181  14182  943 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 41}_2 ∧ -b^{23, 41}_1 ∧ -b^{23, 41}_0 ∧ true) 
c  in CNF:
c    -b^{23, 41}_2 ∨  b^{23, 41}_1 ∨  b^{23, 41}_0 ∨ false 
c  in DIMACS:
-14180  14181  14182  0

c  3 does not represent an automaton state.
c    -(-b^{23, 41}_2 ∧  b^{23, 41}_1 ∧  b^{23, 41}_0 ∧ true) 
c  in CNF:
c     b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ false 
c  in DIMACS:
 14180 -14181 -14182  0
c  -3 does not represent an automaton state.
c    -( b^{23, 41}_2 ∧  b^{23, 41}_1 ∧  b^{23, 41}_0 ∧ true) 
c  in CNF:
c    -b^{23, 41}_2 ∨ -b^{23, 41}_1 ∨ -b^{23, 41}_0 ∨ false 
c  in DIMACS:
-14180 -14181 -14182  0

c i = 42
c  -2+1 --> -1
c    ( b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧  p_966) -> ( b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0)
c  in CNF:
c    -b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨  b^{23, 43}_2
c    -b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_1
c    -b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨  b^{23, 43}_0
c  in DIMACS:
-14183 -14184  14185 -966  14186 0
-14183 -14184  14185 -966 -14187 0
-14183 -14184  14185 -966  14188 0

c  -1+1 --> 0
c    ( b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0 ∧  p_966) -> (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧ -b^{23, 43}_0)
c  in CNF:
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_2
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_1
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_0
c  in DIMACS:
-14183  14184 -14185 -966 -14186 0
-14183  14184 -14185 -966 -14187 0
-14183  14184 -14185 -966 -14188 0

c  0+1 --> 1
c    (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧  p_966) -> (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0)
c  in CNF:
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_2
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_1
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨  b^{23, 43}_0
c  in DIMACS:
 14183  14184  14185 -966 -14186 0
 14183  14184  14185 -966 -14187 0
 14183  14184  14185 -966  14188 0

c  1+1 --> 2
c    (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0 ∧  p_966) -> (-b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0)
c  in CNF:
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_2
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨  b^{23, 43}_1
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ -p_966 ∨ -b^{23, 43}_0
c  in DIMACS:
 14183  14184 -14185 -966 -14186 0
 14183  14184 -14185 -966  14187 0
 14183  14184 -14185 -966 -14188 0

c  2+1 --> break 
c    (-b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧  p_966) -> break
c  in CNF:
c     b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 14183 -14184  14185 -966 1162 0


c  2-1 --> 1
c    (-b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧ -p_966) -> (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0)
c  in CNF:
c     b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_2
c     b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_1
c     b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨  b^{23, 43}_0
c  in DIMACS:
 14183 -14184  14185  966 -14186 0
 14183 -14184  14185  966 -14187 0
 14183 -14184  14185  966  14188 0

c  1-1 --> 0
c    (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0 ∧ -p_966) -> (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧ -b^{23, 43}_0)
c  in CNF:
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_2
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_1
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_0
c  in DIMACS:
 14183  14184 -14185  966 -14186 0
 14183  14184 -14185  966 -14187 0
 14183  14184 -14185  966 -14188 0

c  0-1 --> -1
c    (-b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧ -p_966) -> ( b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0)
c  in CNF:
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨  b^{23, 43}_2
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_1
c     b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨  b^{23, 43}_0
c  in DIMACS:
 14183  14184  14185  966  14186 0
 14183  14184  14185  966 -14187 0
 14183  14184  14185  966  14188 0

c  -1-1 --> -2
c    ( b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧  b^{23, 42}_0 ∧ -p_966) -> ( b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0)
c  in CNF:
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨  b^{23, 43}_2
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨  b^{23, 43}_1
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨  p_966 ∨ -b^{23, 43}_0
c  in DIMACS:
-14183  14184 -14185  966  14186 0
-14183  14184 -14185  966  14187 0
-14183  14184 -14185  966 -14188 0

c  -2-1 --> break 
c    ( b^{23, 42}_2 ∧  b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨  b^{23, 42}_0 ∨  p_966 ∨ break
c  in DIMACS:
-14183 -14184  14185  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 42}_2 ∧ -b^{23, 42}_1 ∧ -b^{23, 42}_0 ∧ true) 
c  in CNF:
c    -b^{23, 42}_2 ∨  b^{23, 42}_1 ∨  b^{23, 42}_0 ∨ false 
c  in DIMACS:
-14183  14184  14185  0

c  3 does not represent an automaton state.
c    -(-b^{23, 42}_2 ∧  b^{23, 42}_1 ∧  b^{23, 42}_0 ∧ true) 
c  in CNF:
c     b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ false 
c  in DIMACS:
 14183 -14184 -14185  0
c  -3 does not represent an automaton state.
c    -( b^{23, 42}_2 ∧  b^{23, 42}_1 ∧  b^{23, 42}_0 ∧ true) 
c  in CNF:
c    -b^{23, 42}_2 ∨ -b^{23, 42}_1 ∨ -b^{23, 42}_0 ∨ false 
c  in DIMACS:
-14183 -14184 -14185  0

c i = 43
c  -2+1 --> -1
c    ( b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧  p_989) -> ( b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0)
c  in CNF:
c    -b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨  b^{23, 44}_2
c    -b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_1
c    -b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨  b^{23, 44}_0
c  in DIMACS:
-14186 -14187  14188 -989  14189 0
-14186 -14187  14188 -989 -14190 0
-14186 -14187  14188 -989  14191 0

c  -1+1 --> 0
c    ( b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0 ∧  p_989) -> (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧ -b^{23, 44}_0)
c  in CNF:
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_2
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_1
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_0
c  in DIMACS:
-14186  14187 -14188 -989 -14189 0
-14186  14187 -14188 -989 -14190 0
-14186  14187 -14188 -989 -14191 0

c  0+1 --> 1
c    (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧  p_989) -> (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0)
c  in CNF:
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_2
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_1
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨  b^{23, 44}_0
c  in DIMACS:
 14186  14187  14188 -989 -14189 0
 14186  14187  14188 -989 -14190 0
 14186  14187  14188 -989  14191 0

c  1+1 --> 2
c    (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0 ∧  p_989) -> (-b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0)
c  in CNF:
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_2
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨  b^{23, 44}_1
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ -p_989 ∨ -b^{23, 44}_0
c  in DIMACS:
 14186  14187 -14188 -989 -14189 0
 14186  14187 -14188 -989  14190 0
 14186  14187 -14188 -989 -14191 0

c  2+1 --> break 
c    (-b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧  p_989) -> break
c  in CNF:
c     b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ -p_989 ∨ break
c  in DIMACS:
 14186 -14187  14188 -989 1162 0


c  2-1 --> 1
c    (-b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧ -p_989) -> (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0)
c  in CNF:
c     b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_2
c     b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_1
c     b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨  b^{23, 44}_0
c  in DIMACS:
 14186 -14187  14188  989 -14189 0
 14186 -14187  14188  989 -14190 0
 14186 -14187  14188  989  14191 0

c  1-1 --> 0
c    (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0 ∧ -p_989) -> (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧ -b^{23, 44}_0)
c  in CNF:
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_2
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_1
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_0
c  in DIMACS:
 14186  14187 -14188  989 -14189 0
 14186  14187 -14188  989 -14190 0
 14186  14187 -14188  989 -14191 0

c  0-1 --> -1
c    (-b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧ -p_989) -> ( b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0)
c  in CNF:
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨  b^{23, 44}_2
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_1
c     b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨  b^{23, 44}_0
c  in DIMACS:
 14186  14187  14188  989  14189 0
 14186  14187  14188  989 -14190 0
 14186  14187  14188  989  14191 0

c  -1-1 --> -2
c    ( b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧  b^{23, 43}_0 ∧ -p_989) -> ( b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0)
c  in CNF:
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨  b^{23, 44}_2
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨  b^{23, 44}_1
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨  p_989 ∨ -b^{23, 44}_0
c  in DIMACS:
-14186  14187 -14188  989  14189 0
-14186  14187 -14188  989  14190 0
-14186  14187 -14188  989 -14191 0

c  -2-1 --> break 
c    ( b^{23, 43}_2 ∧  b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧ -p_989) -> break
c  in CNF:
c    -b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨  b^{23, 43}_0 ∨  p_989 ∨ break
c  in DIMACS:
-14186 -14187  14188  989 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 43}_2 ∧ -b^{23, 43}_1 ∧ -b^{23, 43}_0 ∧ true) 
c  in CNF:
c    -b^{23, 43}_2 ∨  b^{23, 43}_1 ∨  b^{23, 43}_0 ∨ false 
c  in DIMACS:
-14186  14187  14188  0

c  3 does not represent an automaton state.
c    -(-b^{23, 43}_2 ∧  b^{23, 43}_1 ∧  b^{23, 43}_0 ∧ true) 
c  in CNF:
c     b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ false 
c  in DIMACS:
 14186 -14187 -14188  0
c  -3 does not represent an automaton state.
c    -( b^{23, 43}_2 ∧  b^{23, 43}_1 ∧  b^{23, 43}_0 ∧ true) 
c  in CNF:
c    -b^{23, 43}_2 ∨ -b^{23, 43}_1 ∨ -b^{23, 43}_0 ∨ false 
c  in DIMACS:
-14186 -14187 -14188  0

c i = 44
c  -2+1 --> -1
c    ( b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧  p_1012) -> ( b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0)
c  in CNF:
c    -b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨  b^{23, 45}_2
c    -b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_1
c    -b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨  b^{23, 45}_0
c  in DIMACS:
-14189 -14190  14191 -1012  14192 0
-14189 -14190  14191 -1012 -14193 0
-14189 -14190  14191 -1012  14194 0

c  -1+1 --> 0
c    ( b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0 ∧  p_1012) -> (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧ -b^{23, 45}_0)
c  in CNF:
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_2
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_1
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_0
c  in DIMACS:
-14189  14190 -14191 -1012 -14192 0
-14189  14190 -14191 -1012 -14193 0
-14189  14190 -14191 -1012 -14194 0

c  0+1 --> 1
c    (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧  p_1012) -> (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0)
c  in CNF:
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_2
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_1
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨  b^{23, 45}_0
c  in DIMACS:
 14189  14190  14191 -1012 -14192 0
 14189  14190  14191 -1012 -14193 0
 14189  14190  14191 -1012  14194 0

c  1+1 --> 2
c    (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0 ∧  p_1012) -> (-b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0)
c  in CNF:
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_2
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨  b^{23, 45}_1
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ -p_1012 ∨ -b^{23, 45}_0
c  in DIMACS:
 14189  14190 -14191 -1012 -14192 0
 14189  14190 -14191 -1012  14193 0
 14189  14190 -14191 -1012 -14194 0

c  2+1 --> break 
c    (-b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 14189 -14190  14191 -1012 1162 0


c  2-1 --> 1
c    (-b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧ -p_1012) -> (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0)
c  in CNF:
c     b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_2
c     b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_1
c     b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨  b^{23, 45}_0
c  in DIMACS:
 14189 -14190  14191  1012 -14192 0
 14189 -14190  14191  1012 -14193 0
 14189 -14190  14191  1012  14194 0

c  1-1 --> 0
c    (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0 ∧ -p_1012) -> (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧ -b^{23, 45}_0)
c  in CNF:
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_2
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_1
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_0
c  in DIMACS:
 14189  14190 -14191  1012 -14192 0
 14189  14190 -14191  1012 -14193 0
 14189  14190 -14191  1012 -14194 0

c  0-1 --> -1
c    (-b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧ -p_1012) -> ( b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0)
c  in CNF:
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨  b^{23, 45}_2
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_1
c     b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨  b^{23, 45}_0
c  in DIMACS:
 14189  14190  14191  1012  14192 0
 14189  14190  14191  1012 -14193 0
 14189  14190  14191  1012  14194 0

c  -1-1 --> -2
c    ( b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧  b^{23, 44}_0 ∧ -p_1012) -> ( b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0)
c  in CNF:
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨  b^{23, 45}_2
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨  b^{23, 45}_1
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨  p_1012 ∨ -b^{23, 45}_0
c  in DIMACS:
-14189  14190 -14191  1012  14192 0
-14189  14190 -14191  1012  14193 0
-14189  14190 -14191  1012 -14194 0

c  -2-1 --> break 
c    ( b^{23, 44}_2 ∧  b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨  b^{23, 44}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-14189 -14190  14191  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 44}_2 ∧ -b^{23, 44}_1 ∧ -b^{23, 44}_0 ∧ true) 
c  in CNF:
c    -b^{23, 44}_2 ∨  b^{23, 44}_1 ∨  b^{23, 44}_0 ∨ false 
c  in DIMACS:
-14189  14190  14191  0

c  3 does not represent an automaton state.
c    -(-b^{23, 44}_2 ∧  b^{23, 44}_1 ∧  b^{23, 44}_0 ∧ true) 
c  in CNF:
c     b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ false 
c  in DIMACS:
 14189 -14190 -14191  0
c  -3 does not represent an automaton state.
c    -( b^{23, 44}_2 ∧  b^{23, 44}_1 ∧  b^{23, 44}_0 ∧ true) 
c  in CNF:
c    -b^{23, 44}_2 ∨ -b^{23, 44}_1 ∨ -b^{23, 44}_0 ∨ false 
c  in DIMACS:
-14189 -14190 -14191  0

c i = 45
c  -2+1 --> -1
c    ( b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧  p_1035) -> ( b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0)
c  in CNF:
c    -b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨  b^{23, 46}_2
c    -b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_1
c    -b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨  b^{23, 46}_0
c  in DIMACS:
-14192 -14193  14194 -1035  14195 0
-14192 -14193  14194 -1035 -14196 0
-14192 -14193  14194 -1035  14197 0

c  -1+1 --> 0
c    ( b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0 ∧  p_1035) -> (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧ -b^{23, 46}_0)
c  in CNF:
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_2
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_1
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_0
c  in DIMACS:
-14192  14193 -14194 -1035 -14195 0
-14192  14193 -14194 -1035 -14196 0
-14192  14193 -14194 -1035 -14197 0

c  0+1 --> 1
c    (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧  p_1035) -> (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0)
c  in CNF:
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_2
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_1
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨  b^{23, 46}_0
c  in DIMACS:
 14192  14193  14194 -1035 -14195 0
 14192  14193  14194 -1035 -14196 0
 14192  14193  14194 -1035  14197 0

c  1+1 --> 2
c    (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0 ∧  p_1035) -> (-b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0)
c  in CNF:
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_2
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨  b^{23, 46}_1
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ -p_1035 ∨ -b^{23, 46}_0
c  in DIMACS:
 14192  14193 -14194 -1035 -14195 0
 14192  14193 -14194 -1035  14196 0
 14192  14193 -14194 -1035 -14197 0

c  2+1 --> break 
c    (-b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 14192 -14193  14194 -1035 1162 0


c  2-1 --> 1
c    (-b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧ -p_1035) -> (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0)
c  in CNF:
c     b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_2
c     b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_1
c     b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨  b^{23, 46}_0
c  in DIMACS:
 14192 -14193  14194  1035 -14195 0
 14192 -14193  14194  1035 -14196 0
 14192 -14193  14194  1035  14197 0

c  1-1 --> 0
c    (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0 ∧ -p_1035) -> (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧ -b^{23, 46}_0)
c  in CNF:
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_2
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_1
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_0
c  in DIMACS:
 14192  14193 -14194  1035 -14195 0
 14192  14193 -14194  1035 -14196 0
 14192  14193 -14194  1035 -14197 0

c  0-1 --> -1
c    (-b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧ -p_1035) -> ( b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0)
c  in CNF:
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨  b^{23, 46}_2
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_1
c     b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨  b^{23, 46}_0
c  in DIMACS:
 14192  14193  14194  1035  14195 0
 14192  14193  14194  1035 -14196 0
 14192  14193  14194  1035  14197 0

c  -1-1 --> -2
c    ( b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧  b^{23, 45}_0 ∧ -p_1035) -> ( b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0)
c  in CNF:
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨  b^{23, 46}_2
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨  b^{23, 46}_1
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨  p_1035 ∨ -b^{23, 46}_0
c  in DIMACS:
-14192  14193 -14194  1035  14195 0
-14192  14193 -14194  1035  14196 0
-14192  14193 -14194  1035 -14197 0

c  -2-1 --> break 
c    ( b^{23, 45}_2 ∧  b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨  b^{23, 45}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-14192 -14193  14194  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 45}_2 ∧ -b^{23, 45}_1 ∧ -b^{23, 45}_0 ∧ true) 
c  in CNF:
c    -b^{23, 45}_2 ∨  b^{23, 45}_1 ∨  b^{23, 45}_0 ∨ false 
c  in DIMACS:
-14192  14193  14194  0

c  3 does not represent an automaton state.
c    -(-b^{23, 45}_2 ∧  b^{23, 45}_1 ∧  b^{23, 45}_0 ∧ true) 
c  in CNF:
c     b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ false 
c  in DIMACS:
 14192 -14193 -14194  0
c  -3 does not represent an automaton state.
c    -( b^{23, 45}_2 ∧  b^{23, 45}_1 ∧  b^{23, 45}_0 ∧ true) 
c  in CNF:
c    -b^{23, 45}_2 ∨ -b^{23, 45}_1 ∨ -b^{23, 45}_0 ∨ false 
c  in DIMACS:
-14192 -14193 -14194  0

c i = 46
c  -2+1 --> -1
c    ( b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧  p_1058) -> ( b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0)
c  in CNF:
c    -b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨  b^{23, 47}_2
c    -b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_1
c    -b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨  b^{23, 47}_0
c  in DIMACS:
-14195 -14196  14197 -1058  14198 0
-14195 -14196  14197 -1058 -14199 0
-14195 -14196  14197 -1058  14200 0

c  -1+1 --> 0
c    ( b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0 ∧  p_1058) -> (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧ -b^{23, 47}_0)
c  in CNF:
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_2
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_1
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_0
c  in DIMACS:
-14195  14196 -14197 -1058 -14198 0
-14195  14196 -14197 -1058 -14199 0
-14195  14196 -14197 -1058 -14200 0

c  0+1 --> 1
c    (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧  p_1058) -> (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0)
c  in CNF:
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_2
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_1
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨  b^{23, 47}_0
c  in DIMACS:
 14195  14196  14197 -1058 -14198 0
 14195  14196  14197 -1058 -14199 0
 14195  14196  14197 -1058  14200 0

c  1+1 --> 2
c    (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0 ∧  p_1058) -> (-b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0)
c  in CNF:
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_2
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨  b^{23, 47}_1
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ -p_1058 ∨ -b^{23, 47}_0
c  in DIMACS:
 14195  14196 -14197 -1058 -14198 0
 14195  14196 -14197 -1058  14199 0
 14195  14196 -14197 -1058 -14200 0

c  2+1 --> break 
c    (-b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧  p_1058) -> break
c  in CNF:
c     b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ -p_1058 ∨ break
c  in DIMACS:
 14195 -14196  14197 -1058 1162 0


c  2-1 --> 1
c    (-b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧ -p_1058) -> (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0)
c  in CNF:
c     b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_2
c     b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_1
c     b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨  b^{23, 47}_0
c  in DIMACS:
 14195 -14196  14197  1058 -14198 0
 14195 -14196  14197  1058 -14199 0
 14195 -14196  14197  1058  14200 0

c  1-1 --> 0
c    (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0 ∧ -p_1058) -> (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧ -b^{23, 47}_0)
c  in CNF:
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_2
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_1
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_0
c  in DIMACS:
 14195  14196 -14197  1058 -14198 0
 14195  14196 -14197  1058 -14199 0
 14195  14196 -14197  1058 -14200 0

c  0-1 --> -1
c    (-b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧ -p_1058) -> ( b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0)
c  in CNF:
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨  b^{23, 47}_2
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_1
c     b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨  b^{23, 47}_0
c  in DIMACS:
 14195  14196  14197  1058  14198 0
 14195  14196  14197  1058 -14199 0
 14195  14196  14197  1058  14200 0

c  -1-1 --> -2
c    ( b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧  b^{23, 46}_0 ∧ -p_1058) -> ( b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0)
c  in CNF:
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨  b^{23, 47}_2
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨  b^{23, 47}_1
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨  p_1058 ∨ -b^{23, 47}_0
c  in DIMACS:
-14195  14196 -14197  1058  14198 0
-14195  14196 -14197  1058  14199 0
-14195  14196 -14197  1058 -14200 0

c  -2-1 --> break 
c    ( b^{23, 46}_2 ∧  b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧ -p_1058) -> break
c  in CNF:
c    -b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨  b^{23, 46}_0 ∨  p_1058 ∨ break
c  in DIMACS:
-14195 -14196  14197  1058 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 46}_2 ∧ -b^{23, 46}_1 ∧ -b^{23, 46}_0 ∧ true) 
c  in CNF:
c    -b^{23, 46}_2 ∨  b^{23, 46}_1 ∨  b^{23, 46}_0 ∨ false 
c  in DIMACS:
-14195  14196  14197  0

c  3 does not represent an automaton state.
c    -(-b^{23, 46}_2 ∧  b^{23, 46}_1 ∧  b^{23, 46}_0 ∧ true) 
c  in CNF:
c     b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ false 
c  in DIMACS:
 14195 -14196 -14197  0
c  -3 does not represent an automaton state.
c    -( b^{23, 46}_2 ∧  b^{23, 46}_1 ∧  b^{23, 46}_0 ∧ true) 
c  in CNF:
c    -b^{23, 46}_2 ∨ -b^{23, 46}_1 ∨ -b^{23, 46}_0 ∨ false 
c  in DIMACS:
-14195 -14196 -14197  0

c i = 47
c  -2+1 --> -1
c    ( b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧  p_1081) -> ( b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0)
c  in CNF:
c    -b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨  b^{23, 48}_2
c    -b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_1
c    -b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨  b^{23, 48}_0
c  in DIMACS:
-14198 -14199  14200 -1081  14201 0
-14198 -14199  14200 -1081 -14202 0
-14198 -14199  14200 -1081  14203 0

c  -1+1 --> 0
c    ( b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0 ∧  p_1081) -> (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧ -b^{23, 48}_0)
c  in CNF:
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_2
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_1
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_0
c  in DIMACS:
-14198  14199 -14200 -1081 -14201 0
-14198  14199 -14200 -1081 -14202 0
-14198  14199 -14200 -1081 -14203 0

c  0+1 --> 1
c    (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧  p_1081) -> (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0)
c  in CNF:
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_2
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_1
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨  b^{23, 48}_0
c  in DIMACS:
 14198  14199  14200 -1081 -14201 0
 14198  14199  14200 -1081 -14202 0
 14198  14199  14200 -1081  14203 0

c  1+1 --> 2
c    (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0 ∧  p_1081) -> (-b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0)
c  in CNF:
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_2
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨  b^{23, 48}_1
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ -p_1081 ∨ -b^{23, 48}_0
c  in DIMACS:
 14198  14199 -14200 -1081 -14201 0
 14198  14199 -14200 -1081  14202 0
 14198  14199 -14200 -1081 -14203 0

c  2+1 --> break 
c    (-b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧  p_1081) -> break
c  in CNF:
c     b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ -p_1081 ∨ break
c  in DIMACS:
 14198 -14199  14200 -1081 1162 0


c  2-1 --> 1
c    (-b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧ -p_1081) -> (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0)
c  in CNF:
c     b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_2
c     b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_1
c     b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨  b^{23, 48}_0
c  in DIMACS:
 14198 -14199  14200  1081 -14201 0
 14198 -14199  14200  1081 -14202 0
 14198 -14199  14200  1081  14203 0

c  1-1 --> 0
c    (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0 ∧ -p_1081) -> (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧ -b^{23, 48}_0)
c  in CNF:
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_2
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_1
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_0
c  in DIMACS:
 14198  14199 -14200  1081 -14201 0
 14198  14199 -14200  1081 -14202 0
 14198  14199 -14200  1081 -14203 0

c  0-1 --> -1
c    (-b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧ -p_1081) -> ( b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0)
c  in CNF:
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨  b^{23, 48}_2
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_1
c     b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨  b^{23, 48}_0
c  in DIMACS:
 14198  14199  14200  1081  14201 0
 14198  14199  14200  1081 -14202 0
 14198  14199  14200  1081  14203 0

c  -1-1 --> -2
c    ( b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧  b^{23, 47}_0 ∧ -p_1081) -> ( b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0)
c  in CNF:
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨  b^{23, 48}_2
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨  b^{23, 48}_1
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨  p_1081 ∨ -b^{23, 48}_0
c  in DIMACS:
-14198  14199 -14200  1081  14201 0
-14198  14199 -14200  1081  14202 0
-14198  14199 -14200  1081 -14203 0

c  -2-1 --> break 
c    ( b^{23, 47}_2 ∧  b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧ -p_1081) -> break
c  in CNF:
c    -b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨  b^{23, 47}_0 ∨  p_1081 ∨ break
c  in DIMACS:
-14198 -14199  14200  1081 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 47}_2 ∧ -b^{23, 47}_1 ∧ -b^{23, 47}_0 ∧ true) 
c  in CNF:
c    -b^{23, 47}_2 ∨  b^{23, 47}_1 ∨  b^{23, 47}_0 ∨ false 
c  in DIMACS:
-14198  14199  14200  0

c  3 does not represent an automaton state.
c    -(-b^{23, 47}_2 ∧  b^{23, 47}_1 ∧  b^{23, 47}_0 ∧ true) 
c  in CNF:
c     b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ false 
c  in DIMACS:
 14198 -14199 -14200  0
c  -3 does not represent an automaton state.
c    -( b^{23, 47}_2 ∧  b^{23, 47}_1 ∧  b^{23, 47}_0 ∧ true) 
c  in CNF:
c    -b^{23, 47}_2 ∨ -b^{23, 47}_1 ∨ -b^{23, 47}_0 ∨ false 
c  in DIMACS:
-14198 -14199 -14200  0

c i = 48
c  -2+1 --> -1
c    ( b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧  p_1104) -> ( b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0)
c  in CNF:
c    -b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨  b^{23, 49}_2
c    -b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_1
c    -b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨  b^{23, 49}_0
c  in DIMACS:
-14201 -14202  14203 -1104  14204 0
-14201 -14202  14203 -1104 -14205 0
-14201 -14202  14203 -1104  14206 0

c  -1+1 --> 0
c    ( b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0 ∧  p_1104) -> (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧ -b^{23, 49}_0)
c  in CNF:
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_2
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_1
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_0
c  in DIMACS:
-14201  14202 -14203 -1104 -14204 0
-14201  14202 -14203 -1104 -14205 0
-14201  14202 -14203 -1104 -14206 0

c  0+1 --> 1
c    (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧  p_1104) -> (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0)
c  in CNF:
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_2
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_1
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨  b^{23, 49}_0
c  in DIMACS:
 14201  14202  14203 -1104 -14204 0
 14201  14202  14203 -1104 -14205 0
 14201  14202  14203 -1104  14206 0

c  1+1 --> 2
c    (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0 ∧  p_1104) -> (-b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0)
c  in CNF:
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_2
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨  b^{23, 49}_1
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ -p_1104 ∨ -b^{23, 49}_0
c  in DIMACS:
 14201  14202 -14203 -1104 -14204 0
 14201  14202 -14203 -1104  14205 0
 14201  14202 -14203 -1104 -14206 0

c  2+1 --> break 
c    (-b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 14201 -14202  14203 -1104 1162 0


c  2-1 --> 1
c    (-b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧ -p_1104) -> (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0)
c  in CNF:
c     b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_2
c     b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_1
c     b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨  b^{23, 49}_0
c  in DIMACS:
 14201 -14202  14203  1104 -14204 0
 14201 -14202  14203  1104 -14205 0
 14201 -14202  14203  1104  14206 0

c  1-1 --> 0
c    (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0 ∧ -p_1104) -> (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧ -b^{23, 49}_0)
c  in CNF:
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_2
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_1
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_0
c  in DIMACS:
 14201  14202 -14203  1104 -14204 0
 14201  14202 -14203  1104 -14205 0
 14201  14202 -14203  1104 -14206 0

c  0-1 --> -1
c    (-b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧ -p_1104) -> ( b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0)
c  in CNF:
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨  b^{23, 49}_2
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_1
c     b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨  b^{23, 49}_0
c  in DIMACS:
 14201  14202  14203  1104  14204 0
 14201  14202  14203  1104 -14205 0
 14201  14202  14203  1104  14206 0

c  -1-1 --> -2
c    ( b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧  b^{23, 48}_0 ∧ -p_1104) -> ( b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0)
c  in CNF:
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨  b^{23, 49}_2
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨  b^{23, 49}_1
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨  p_1104 ∨ -b^{23, 49}_0
c  in DIMACS:
-14201  14202 -14203  1104  14204 0
-14201  14202 -14203  1104  14205 0
-14201  14202 -14203  1104 -14206 0

c  -2-1 --> break 
c    ( b^{23, 48}_2 ∧  b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨  b^{23, 48}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-14201 -14202  14203  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 48}_2 ∧ -b^{23, 48}_1 ∧ -b^{23, 48}_0 ∧ true) 
c  in CNF:
c    -b^{23, 48}_2 ∨  b^{23, 48}_1 ∨  b^{23, 48}_0 ∨ false 
c  in DIMACS:
-14201  14202  14203  0

c  3 does not represent an automaton state.
c    -(-b^{23, 48}_2 ∧  b^{23, 48}_1 ∧  b^{23, 48}_0 ∧ true) 
c  in CNF:
c     b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ false 
c  in DIMACS:
 14201 -14202 -14203  0
c  -3 does not represent an automaton state.
c    -( b^{23, 48}_2 ∧  b^{23, 48}_1 ∧  b^{23, 48}_0 ∧ true) 
c  in CNF:
c    -b^{23, 48}_2 ∨ -b^{23, 48}_1 ∨ -b^{23, 48}_0 ∨ false 
c  in DIMACS:
-14201 -14202 -14203  0

c i = 49
c  -2+1 --> -1
c    ( b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧  p_1127) -> ( b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0)
c  in CNF:
c    -b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨  b^{23, 50}_2
c    -b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_1
c    -b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨  b^{23, 50}_0
c  in DIMACS:
-14204 -14205  14206 -1127  14207 0
-14204 -14205  14206 -1127 -14208 0
-14204 -14205  14206 -1127  14209 0

c  -1+1 --> 0
c    ( b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0 ∧  p_1127) -> (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧ -b^{23, 50}_0)
c  in CNF:
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_2
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_1
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_0
c  in DIMACS:
-14204  14205 -14206 -1127 -14207 0
-14204  14205 -14206 -1127 -14208 0
-14204  14205 -14206 -1127 -14209 0

c  0+1 --> 1
c    (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧  p_1127) -> (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0)
c  in CNF:
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_2
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_1
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨  b^{23, 50}_0
c  in DIMACS:
 14204  14205  14206 -1127 -14207 0
 14204  14205  14206 -1127 -14208 0
 14204  14205  14206 -1127  14209 0

c  1+1 --> 2
c    (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0 ∧  p_1127) -> (-b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0)
c  in CNF:
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_2
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨  b^{23, 50}_1
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ -p_1127 ∨ -b^{23, 50}_0
c  in DIMACS:
 14204  14205 -14206 -1127 -14207 0
 14204  14205 -14206 -1127  14208 0
 14204  14205 -14206 -1127 -14209 0

c  2+1 --> break 
c    (-b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧  p_1127) -> break
c  in CNF:
c     b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ -p_1127 ∨ break
c  in DIMACS:
 14204 -14205  14206 -1127 1162 0


c  2-1 --> 1
c    (-b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧ -p_1127) -> (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0)
c  in CNF:
c     b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_2
c     b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_1
c     b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨  b^{23, 50}_0
c  in DIMACS:
 14204 -14205  14206  1127 -14207 0
 14204 -14205  14206  1127 -14208 0
 14204 -14205  14206  1127  14209 0

c  1-1 --> 0
c    (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0 ∧ -p_1127) -> (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧ -b^{23, 50}_0)
c  in CNF:
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_2
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_1
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_0
c  in DIMACS:
 14204  14205 -14206  1127 -14207 0
 14204  14205 -14206  1127 -14208 0
 14204  14205 -14206  1127 -14209 0

c  0-1 --> -1
c    (-b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧ -p_1127) -> ( b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0)
c  in CNF:
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨  b^{23, 50}_2
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_1
c     b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨  b^{23, 50}_0
c  in DIMACS:
 14204  14205  14206  1127  14207 0
 14204  14205  14206  1127 -14208 0
 14204  14205  14206  1127  14209 0

c  -1-1 --> -2
c    ( b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧  b^{23, 49}_0 ∧ -p_1127) -> ( b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0)
c  in CNF:
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨  b^{23, 50}_2
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨  b^{23, 50}_1
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨  p_1127 ∨ -b^{23, 50}_0
c  in DIMACS:
-14204  14205 -14206  1127  14207 0
-14204  14205 -14206  1127  14208 0
-14204  14205 -14206  1127 -14209 0

c  -2-1 --> break 
c    ( b^{23, 49}_2 ∧  b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧ -p_1127) -> break
c  in CNF:
c    -b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨  b^{23, 49}_0 ∨  p_1127 ∨ break
c  in DIMACS:
-14204 -14205  14206  1127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 49}_2 ∧ -b^{23, 49}_1 ∧ -b^{23, 49}_0 ∧ true) 
c  in CNF:
c    -b^{23, 49}_2 ∨  b^{23, 49}_1 ∨  b^{23, 49}_0 ∨ false 
c  in DIMACS:
-14204  14205  14206  0

c  3 does not represent an automaton state.
c    -(-b^{23, 49}_2 ∧  b^{23, 49}_1 ∧  b^{23, 49}_0 ∧ true) 
c  in CNF:
c     b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ false 
c  in DIMACS:
 14204 -14205 -14206  0
c  -3 does not represent an automaton state.
c    -( b^{23, 49}_2 ∧  b^{23, 49}_1 ∧  b^{23, 49}_0 ∧ true) 
c  in CNF:
c    -b^{23, 49}_2 ∨ -b^{23, 49}_1 ∨ -b^{23, 49}_0 ∨ false 
c  in DIMACS:
-14204 -14205 -14206  0

c i = 50
c  -2+1 --> -1
c    ( b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧  p_1150) -> ( b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧  b^{23, 51}_0)
c  in CNF:
c    -b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨  b^{23, 51}_2
c    -b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_1
c    -b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨  b^{23, 51}_0
c  in DIMACS:
-14207 -14208  14209 -1150  14210 0
-14207 -14208  14209 -1150 -14211 0
-14207 -14208  14209 -1150  14212 0

c  -1+1 --> 0
c    ( b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0 ∧  p_1150) -> (-b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧ -b^{23, 51}_0)
c  in CNF:
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_2
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_1
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_0
c  in DIMACS:
-14207  14208 -14209 -1150 -14210 0
-14207  14208 -14209 -1150 -14211 0
-14207  14208 -14209 -1150 -14212 0

c  0+1 --> 1
c    (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧  p_1150) -> (-b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧  b^{23, 51}_0)
c  in CNF:
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_2
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_1
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨  b^{23, 51}_0
c  in DIMACS:
 14207  14208  14209 -1150 -14210 0
 14207  14208  14209 -1150 -14211 0
 14207  14208  14209 -1150  14212 0

c  1+1 --> 2
c    (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0 ∧  p_1150) -> (-b^{23, 51}_2 ∧  b^{23, 51}_1 ∧ -b^{23, 51}_0)
c  in CNF:
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_2
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨  b^{23, 51}_1
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ -p_1150 ∨ -b^{23, 51}_0
c  in DIMACS:
 14207  14208 -14209 -1150 -14210 0
 14207  14208 -14209 -1150  14211 0
 14207  14208 -14209 -1150 -14212 0

c  2+1 --> break 
c    (-b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 14207 -14208  14209 -1150 1162 0


c  2-1 --> 1
c    (-b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧ -p_1150) -> (-b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧  b^{23, 51}_0)
c  in CNF:
c     b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_2
c     b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_1
c     b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨  b^{23, 51}_0
c  in DIMACS:
 14207 -14208  14209  1150 -14210 0
 14207 -14208  14209  1150 -14211 0
 14207 -14208  14209  1150  14212 0

c  1-1 --> 0
c    (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0 ∧ -p_1150) -> (-b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧ -b^{23, 51}_0)
c  in CNF:
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_2
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_1
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_0
c  in DIMACS:
 14207  14208 -14209  1150 -14210 0
 14207  14208 -14209  1150 -14211 0
 14207  14208 -14209  1150 -14212 0

c  0-1 --> -1
c    (-b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧ -p_1150) -> ( b^{23, 51}_2 ∧ -b^{23, 51}_1 ∧  b^{23, 51}_0)
c  in CNF:
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨  b^{23, 51}_2
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_1
c     b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨  b^{23, 51}_0
c  in DIMACS:
 14207  14208  14209  1150  14210 0
 14207  14208  14209  1150 -14211 0
 14207  14208  14209  1150  14212 0

c  -1-1 --> -2
c    ( b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧  b^{23, 50}_0 ∧ -p_1150) -> ( b^{23, 51}_2 ∧  b^{23, 51}_1 ∧ -b^{23, 51}_0)
c  in CNF:
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨  b^{23, 51}_2
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨  b^{23, 51}_1
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨  p_1150 ∨ -b^{23, 51}_0
c  in DIMACS:
-14207  14208 -14209  1150  14210 0
-14207  14208 -14209  1150  14211 0
-14207  14208 -14209  1150 -14212 0

c  -2-1 --> break 
c    ( b^{23, 50}_2 ∧  b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨  b^{23, 50}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-14207 -14208  14209  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{23, 50}_2 ∧ -b^{23, 50}_1 ∧ -b^{23, 50}_0 ∧ true) 
c  in CNF:
c    -b^{23, 50}_2 ∨  b^{23, 50}_1 ∨  b^{23, 50}_0 ∨ false 
c  in DIMACS:
-14207  14208  14209  0

c  3 does not represent an automaton state.
c    -(-b^{23, 50}_2 ∧  b^{23, 50}_1 ∧  b^{23, 50}_0 ∧ true) 
c  in CNF:
c     b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ false 
c  in DIMACS:
 14207 -14208 -14209  0
c  -3 does not represent an automaton state.
c    -( b^{23, 50}_2 ∧  b^{23, 50}_1 ∧  b^{23, 50}_0 ∧ true) 
c  in CNF:
c    -b^{23, 50}_2 ∨ -b^{23, 50}_1 ∨ -b^{23, 50}_0 ∨ false 
c  in DIMACS:
-14207 -14208 -14209  0

c INIT for k = 24
c    -b^{24, 1}_2
c    -b^{24, 1}_1
c    -b^{24, 1}_0
c  in DIMACS:
-14213 0
-14214 0
-14215 0

c Transitions for k = 24
c i = 1
c  -2+1 --> -1
c    ( b^{24, 1}_2 ∧  b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧  p_24) -> ( b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0)
c  in CNF:
c    -b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨  b^{24, 2}_2
c    -b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_1
c    -b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨  b^{24, 2}_0
c  in DIMACS:
-14213 -14214  14215 -24  14216 0
-14213 -14214  14215 -24 -14217 0
-14213 -14214  14215 -24  14218 0

c  -1+1 --> 0
c    ( b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧  b^{24, 1}_0 ∧  p_24) -> (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧ -b^{24, 2}_0)
c  in CNF:
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_2
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_1
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_0
c  in DIMACS:
-14213  14214 -14215 -24 -14216 0
-14213  14214 -14215 -24 -14217 0
-14213  14214 -14215 -24 -14218 0

c  0+1 --> 1
c    (-b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧  p_24) -> (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0)
c  in CNF:
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_2
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_1
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨  b^{24, 2}_0
c  in DIMACS:
 14213  14214  14215 -24 -14216 0
 14213  14214  14215 -24 -14217 0
 14213  14214  14215 -24  14218 0

c  1+1 --> 2
c    (-b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧  b^{24, 1}_0 ∧  p_24) -> (-b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0)
c  in CNF:
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_2
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨  b^{24, 2}_1
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ -p_24 ∨ -b^{24, 2}_0
c  in DIMACS:
 14213  14214 -14215 -24 -14216 0
 14213  14214 -14215 -24  14217 0
 14213  14214 -14215 -24 -14218 0

c  2+1 --> break 
c    (-b^{24, 1}_2 ∧  b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧  p_24) -> break
c  in CNF:
c     b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ -p_24 ∨ break
c  in DIMACS:
 14213 -14214  14215 -24 1162 0


c  2-1 --> 1
c    (-b^{24, 1}_2 ∧  b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧ -p_24) -> (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0)
c  in CNF:
c     b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_2
c     b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_1
c     b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨  b^{24, 2}_0
c  in DIMACS:
 14213 -14214  14215  24 -14216 0
 14213 -14214  14215  24 -14217 0
 14213 -14214  14215  24  14218 0

c  1-1 --> 0
c    (-b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧  b^{24, 1}_0 ∧ -p_24) -> (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧ -b^{24, 2}_0)
c  in CNF:
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_2
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_1
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_0
c  in DIMACS:
 14213  14214 -14215  24 -14216 0
 14213  14214 -14215  24 -14217 0
 14213  14214 -14215  24 -14218 0

c  0-1 --> -1
c    (-b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧ -p_24) -> ( b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0)
c  in CNF:
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨  b^{24, 2}_2
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_1
c     b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨  b^{24, 2}_0
c  in DIMACS:
 14213  14214  14215  24  14216 0
 14213  14214  14215  24 -14217 0
 14213  14214  14215  24  14218 0

c  -1-1 --> -2
c    ( b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧  b^{24, 1}_0 ∧ -p_24) -> ( b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0)
c  in CNF:
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨  b^{24, 2}_2
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨  b^{24, 2}_1
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨  p_24 ∨ -b^{24, 2}_0
c  in DIMACS:
-14213  14214 -14215  24  14216 0
-14213  14214 -14215  24  14217 0
-14213  14214 -14215  24 -14218 0

c  -2-1 --> break 
c    ( b^{24, 1}_2 ∧  b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧ -p_24) -> break
c  in CNF:
c    -b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨  b^{24, 1}_0 ∨  p_24 ∨ break
c  in DIMACS:
-14213 -14214  14215  24 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 1}_2 ∧ -b^{24, 1}_1 ∧ -b^{24, 1}_0 ∧ true) 
c  in CNF:
c    -b^{24, 1}_2 ∨  b^{24, 1}_1 ∨  b^{24, 1}_0 ∨ false 
c  in DIMACS:
-14213  14214  14215  0

c  3 does not represent an automaton state.
c    -(-b^{24, 1}_2 ∧  b^{24, 1}_1 ∧  b^{24, 1}_0 ∧ true) 
c  in CNF:
c     b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ false 
c  in DIMACS:
 14213 -14214 -14215  0
c  -3 does not represent an automaton state.
c    -( b^{24, 1}_2 ∧  b^{24, 1}_1 ∧  b^{24, 1}_0 ∧ true) 
c  in CNF:
c    -b^{24, 1}_2 ∨ -b^{24, 1}_1 ∨ -b^{24, 1}_0 ∨ false 
c  in DIMACS:
-14213 -14214 -14215  0

c i = 2
c  -2+1 --> -1
c    ( b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧  p_48) -> ( b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0)
c  in CNF:
c    -b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨  b^{24, 3}_2
c    -b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_1
c    -b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨  b^{24, 3}_0
c  in DIMACS:
-14216 -14217  14218 -48  14219 0
-14216 -14217  14218 -48 -14220 0
-14216 -14217  14218 -48  14221 0

c  -1+1 --> 0
c    ( b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0 ∧  p_48) -> (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧ -b^{24, 3}_0)
c  in CNF:
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_2
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_1
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_0
c  in DIMACS:
-14216  14217 -14218 -48 -14219 0
-14216  14217 -14218 -48 -14220 0
-14216  14217 -14218 -48 -14221 0

c  0+1 --> 1
c    (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧  p_48) -> (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0)
c  in CNF:
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_2
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_1
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨  b^{24, 3}_0
c  in DIMACS:
 14216  14217  14218 -48 -14219 0
 14216  14217  14218 -48 -14220 0
 14216  14217  14218 -48  14221 0

c  1+1 --> 2
c    (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0 ∧  p_48) -> (-b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0)
c  in CNF:
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_2
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨  b^{24, 3}_1
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ -p_48 ∨ -b^{24, 3}_0
c  in DIMACS:
 14216  14217 -14218 -48 -14219 0
 14216  14217 -14218 -48  14220 0
 14216  14217 -14218 -48 -14221 0

c  2+1 --> break 
c    (-b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧  p_48) -> break
c  in CNF:
c     b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 14216 -14217  14218 -48 1162 0


c  2-1 --> 1
c    (-b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧ -p_48) -> (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0)
c  in CNF:
c     b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_2
c     b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_1
c     b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨  b^{24, 3}_0
c  in DIMACS:
 14216 -14217  14218  48 -14219 0
 14216 -14217  14218  48 -14220 0
 14216 -14217  14218  48  14221 0

c  1-1 --> 0
c    (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0 ∧ -p_48) -> (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧ -b^{24, 3}_0)
c  in CNF:
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_2
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_1
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_0
c  in DIMACS:
 14216  14217 -14218  48 -14219 0
 14216  14217 -14218  48 -14220 0
 14216  14217 -14218  48 -14221 0

c  0-1 --> -1
c    (-b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧ -p_48) -> ( b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0)
c  in CNF:
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨  b^{24, 3}_2
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_1
c     b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨  b^{24, 3}_0
c  in DIMACS:
 14216  14217  14218  48  14219 0
 14216  14217  14218  48 -14220 0
 14216  14217  14218  48  14221 0

c  -1-1 --> -2
c    ( b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧  b^{24, 2}_0 ∧ -p_48) -> ( b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0)
c  in CNF:
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨  b^{24, 3}_2
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨  b^{24, 3}_1
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨  p_48 ∨ -b^{24, 3}_0
c  in DIMACS:
-14216  14217 -14218  48  14219 0
-14216  14217 -14218  48  14220 0
-14216  14217 -14218  48 -14221 0

c  -2-1 --> break 
c    ( b^{24, 2}_2 ∧  b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨  b^{24, 2}_0 ∨  p_48 ∨ break
c  in DIMACS:
-14216 -14217  14218  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 2}_2 ∧ -b^{24, 2}_1 ∧ -b^{24, 2}_0 ∧ true) 
c  in CNF:
c    -b^{24, 2}_2 ∨  b^{24, 2}_1 ∨  b^{24, 2}_0 ∨ false 
c  in DIMACS:
-14216  14217  14218  0

c  3 does not represent an automaton state.
c    -(-b^{24, 2}_2 ∧  b^{24, 2}_1 ∧  b^{24, 2}_0 ∧ true) 
c  in CNF:
c     b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ false 
c  in DIMACS:
 14216 -14217 -14218  0
c  -3 does not represent an automaton state.
c    -( b^{24, 2}_2 ∧  b^{24, 2}_1 ∧  b^{24, 2}_0 ∧ true) 
c  in CNF:
c    -b^{24, 2}_2 ∨ -b^{24, 2}_1 ∨ -b^{24, 2}_0 ∨ false 
c  in DIMACS:
-14216 -14217 -14218  0

c i = 3
c  -2+1 --> -1
c    ( b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧  p_72) -> ( b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0)
c  in CNF:
c    -b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨  b^{24, 4}_2
c    -b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_1
c    -b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨  b^{24, 4}_0
c  in DIMACS:
-14219 -14220  14221 -72  14222 0
-14219 -14220  14221 -72 -14223 0
-14219 -14220  14221 -72  14224 0

c  -1+1 --> 0
c    ( b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0 ∧  p_72) -> (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧ -b^{24, 4}_0)
c  in CNF:
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_2
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_1
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_0
c  in DIMACS:
-14219  14220 -14221 -72 -14222 0
-14219  14220 -14221 -72 -14223 0
-14219  14220 -14221 -72 -14224 0

c  0+1 --> 1
c    (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧  p_72) -> (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0)
c  in CNF:
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_2
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_1
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨  b^{24, 4}_0
c  in DIMACS:
 14219  14220  14221 -72 -14222 0
 14219  14220  14221 -72 -14223 0
 14219  14220  14221 -72  14224 0

c  1+1 --> 2
c    (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0 ∧  p_72) -> (-b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0)
c  in CNF:
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_2
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨  b^{24, 4}_1
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ -p_72 ∨ -b^{24, 4}_0
c  in DIMACS:
 14219  14220 -14221 -72 -14222 0
 14219  14220 -14221 -72  14223 0
 14219  14220 -14221 -72 -14224 0

c  2+1 --> break 
c    (-b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧  p_72) -> break
c  in CNF:
c     b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 14219 -14220  14221 -72 1162 0


c  2-1 --> 1
c    (-b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧ -p_72) -> (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0)
c  in CNF:
c     b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_2
c     b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_1
c     b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨  b^{24, 4}_0
c  in DIMACS:
 14219 -14220  14221  72 -14222 0
 14219 -14220  14221  72 -14223 0
 14219 -14220  14221  72  14224 0

c  1-1 --> 0
c    (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0 ∧ -p_72) -> (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧ -b^{24, 4}_0)
c  in CNF:
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_2
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_1
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_0
c  in DIMACS:
 14219  14220 -14221  72 -14222 0
 14219  14220 -14221  72 -14223 0
 14219  14220 -14221  72 -14224 0

c  0-1 --> -1
c    (-b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧ -p_72) -> ( b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0)
c  in CNF:
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨  b^{24, 4}_2
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_1
c     b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨  b^{24, 4}_0
c  in DIMACS:
 14219  14220  14221  72  14222 0
 14219  14220  14221  72 -14223 0
 14219  14220  14221  72  14224 0

c  -1-1 --> -2
c    ( b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧  b^{24, 3}_0 ∧ -p_72) -> ( b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0)
c  in CNF:
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨  b^{24, 4}_2
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨  b^{24, 4}_1
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨  p_72 ∨ -b^{24, 4}_0
c  in DIMACS:
-14219  14220 -14221  72  14222 0
-14219  14220 -14221  72  14223 0
-14219  14220 -14221  72 -14224 0

c  -2-1 --> break 
c    ( b^{24, 3}_2 ∧  b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨  b^{24, 3}_0 ∨  p_72 ∨ break
c  in DIMACS:
-14219 -14220  14221  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 3}_2 ∧ -b^{24, 3}_1 ∧ -b^{24, 3}_0 ∧ true) 
c  in CNF:
c    -b^{24, 3}_2 ∨  b^{24, 3}_1 ∨  b^{24, 3}_0 ∨ false 
c  in DIMACS:
-14219  14220  14221  0

c  3 does not represent an automaton state.
c    -(-b^{24, 3}_2 ∧  b^{24, 3}_1 ∧  b^{24, 3}_0 ∧ true) 
c  in CNF:
c     b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ false 
c  in DIMACS:
 14219 -14220 -14221  0
c  -3 does not represent an automaton state.
c    -( b^{24, 3}_2 ∧  b^{24, 3}_1 ∧  b^{24, 3}_0 ∧ true) 
c  in CNF:
c    -b^{24, 3}_2 ∨ -b^{24, 3}_1 ∨ -b^{24, 3}_0 ∨ false 
c  in DIMACS:
-14219 -14220 -14221  0

c i = 4
c  -2+1 --> -1
c    ( b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧  p_96) -> ( b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0)
c  in CNF:
c    -b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨  b^{24, 5}_2
c    -b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_1
c    -b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨  b^{24, 5}_0
c  in DIMACS:
-14222 -14223  14224 -96  14225 0
-14222 -14223  14224 -96 -14226 0
-14222 -14223  14224 -96  14227 0

c  -1+1 --> 0
c    ( b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0 ∧  p_96) -> (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧ -b^{24, 5}_0)
c  in CNF:
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_2
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_1
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_0
c  in DIMACS:
-14222  14223 -14224 -96 -14225 0
-14222  14223 -14224 -96 -14226 0
-14222  14223 -14224 -96 -14227 0

c  0+1 --> 1
c    (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧  p_96) -> (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0)
c  in CNF:
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_2
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_1
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨  b^{24, 5}_0
c  in DIMACS:
 14222  14223  14224 -96 -14225 0
 14222  14223  14224 -96 -14226 0
 14222  14223  14224 -96  14227 0

c  1+1 --> 2
c    (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0 ∧  p_96) -> (-b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0)
c  in CNF:
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_2
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨  b^{24, 5}_1
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ -p_96 ∨ -b^{24, 5}_0
c  in DIMACS:
 14222  14223 -14224 -96 -14225 0
 14222  14223 -14224 -96  14226 0
 14222  14223 -14224 -96 -14227 0

c  2+1 --> break 
c    (-b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧  p_96) -> break
c  in CNF:
c     b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 14222 -14223  14224 -96 1162 0


c  2-1 --> 1
c    (-b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧ -p_96) -> (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0)
c  in CNF:
c     b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_2
c     b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_1
c     b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨  b^{24, 5}_0
c  in DIMACS:
 14222 -14223  14224  96 -14225 0
 14222 -14223  14224  96 -14226 0
 14222 -14223  14224  96  14227 0

c  1-1 --> 0
c    (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0 ∧ -p_96) -> (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧ -b^{24, 5}_0)
c  in CNF:
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_2
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_1
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_0
c  in DIMACS:
 14222  14223 -14224  96 -14225 0
 14222  14223 -14224  96 -14226 0
 14222  14223 -14224  96 -14227 0

c  0-1 --> -1
c    (-b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧ -p_96) -> ( b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0)
c  in CNF:
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨  b^{24, 5}_2
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_1
c     b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨  b^{24, 5}_0
c  in DIMACS:
 14222  14223  14224  96  14225 0
 14222  14223  14224  96 -14226 0
 14222  14223  14224  96  14227 0

c  -1-1 --> -2
c    ( b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧  b^{24, 4}_0 ∧ -p_96) -> ( b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0)
c  in CNF:
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨  b^{24, 5}_2
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨  b^{24, 5}_1
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨  p_96 ∨ -b^{24, 5}_0
c  in DIMACS:
-14222  14223 -14224  96  14225 0
-14222  14223 -14224  96  14226 0
-14222  14223 -14224  96 -14227 0

c  -2-1 --> break 
c    ( b^{24, 4}_2 ∧  b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨  b^{24, 4}_0 ∨  p_96 ∨ break
c  in DIMACS:
-14222 -14223  14224  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 4}_2 ∧ -b^{24, 4}_1 ∧ -b^{24, 4}_0 ∧ true) 
c  in CNF:
c    -b^{24, 4}_2 ∨  b^{24, 4}_1 ∨  b^{24, 4}_0 ∨ false 
c  in DIMACS:
-14222  14223  14224  0

c  3 does not represent an automaton state.
c    -(-b^{24, 4}_2 ∧  b^{24, 4}_1 ∧  b^{24, 4}_0 ∧ true) 
c  in CNF:
c     b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ false 
c  in DIMACS:
 14222 -14223 -14224  0
c  -3 does not represent an automaton state.
c    -( b^{24, 4}_2 ∧  b^{24, 4}_1 ∧  b^{24, 4}_0 ∧ true) 
c  in CNF:
c    -b^{24, 4}_2 ∨ -b^{24, 4}_1 ∨ -b^{24, 4}_0 ∨ false 
c  in DIMACS:
-14222 -14223 -14224  0

c i = 5
c  -2+1 --> -1
c    ( b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧  p_120) -> ( b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0)
c  in CNF:
c    -b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨  b^{24, 6}_2
c    -b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_1
c    -b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨  b^{24, 6}_0
c  in DIMACS:
-14225 -14226  14227 -120  14228 0
-14225 -14226  14227 -120 -14229 0
-14225 -14226  14227 -120  14230 0

c  -1+1 --> 0
c    ( b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0 ∧  p_120) -> (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧ -b^{24, 6}_0)
c  in CNF:
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_2
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_1
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_0
c  in DIMACS:
-14225  14226 -14227 -120 -14228 0
-14225  14226 -14227 -120 -14229 0
-14225  14226 -14227 -120 -14230 0

c  0+1 --> 1
c    (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧  p_120) -> (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0)
c  in CNF:
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_2
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_1
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨  b^{24, 6}_0
c  in DIMACS:
 14225  14226  14227 -120 -14228 0
 14225  14226  14227 -120 -14229 0
 14225  14226  14227 -120  14230 0

c  1+1 --> 2
c    (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0 ∧  p_120) -> (-b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0)
c  in CNF:
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_2
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨  b^{24, 6}_1
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ -p_120 ∨ -b^{24, 6}_0
c  in DIMACS:
 14225  14226 -14227 -120 -14228 0
 14225  14226 -14227 -120  14229 0
 14225  14226 -14227 -120 -14230 0

c  2+1 --> break 
c    (-b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧  p_120) -> break
c  in CNF:
c     b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 14225 -14226  14227 -120 1162 0


c  2-1 --> 1
c    (-b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧ -p_120) -> (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0)
c  in CNF:
c     b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_2
c     b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_1
c     b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨  b^{24, 6}_0
c  in DIMACS:
 14225 -14226  14227  120 -14228 0
 14225 -14226  14227  120 -14229 0
 14225 -14226  14227  120  14230 0

c  1-1 --> 0
c    (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0 ∧ -p_120) -> (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧ -b^{24, 6}_0)
c  in CNF:
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_2
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_1
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_0
c  in DIMACS:
 14225  14226 -14227  120 -14228 0
 14225  14226 -14227  120 -14229 0
 14225  14226 -14227  120 -14230 0

c  0-1 --> -1
c    (-b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧ -p_120) -> ( b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0)
c  in CNF:
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨  b^{24, 6}_2
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_1
c     b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨  b^{24, 6}_0
c  in DIMACS:
 14225  14226  14227  120  14228 0
 14225  14226  14227  120 -14229 0
 14225  14226  14227  120  14230 0

c  -1-1 --> -2
c    ( b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧  b^{24, 5}_0 ∧ -p_120) -> ( b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0)
c  in CNF:
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨  b^{24, 6}_2
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨  b^{24, 6}_1
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨  p_120 ∨ -b^{24, 6}_0
c  in DIMACS:
-14225  14226 -14227  120  14228 0
-14225  14226 -14227  120  14229 0
-14225  14226 -14227  120 -14230 0

c  -2-1 --> break 
c    ( b^{24, 5}_2 ∧  b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨  b^{24, 5}_0 ∨  p_120 ∨ break
c  in DIMACS:
-14225 -14226  14227  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 5}_2 ∧ -b^{24, 5}_1 ∧ -b^{24, 5}_0 ∧ true) 
c  in CNF:
c    -b^{24, 5}_2 ∨  b^{24, 5}_1 ∨  b^{24, 5}_0 ∨ false 
c  in DIMACS:
-14225  14226  14227  0

c  3 does not represent an automaton state.
c    -(-b^{24, 5}_2 ∧  b^{24, 5}_1 ∧  b^{24, 5}_0 ∧ true) 
c  in CNF:
c     b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ false 
c  in DIMACS:
 14225 -14226 -14227  0
c  -3 does not represent an automaton state.
c    -( b^{24, 5}_2 ∧  b^{24, 5}_1 ∧  b^{24, 5}_0 ∧ true) 
c  in CNF:
c    -b^{24, 5}_2 ∨ -b^{24, 5}_1 ∨ -b^{24, 5}_0 ∨ false 
c  in DIMACS:
-14225 -14226 -14227  0

c i = 6
c  -2+1 --> -1
c    ( b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧  p_144) -> ( b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0)
c  in CNF:
c    -b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨  b^{24, 7}_2
c    -b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_1
c    -b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨  b^{24, 7}_0
c  in DIMACS:
-14228 -14229  14230 -144  14231 0
-14228 -14229  14230 -144 -14232 0
-14228 -14229  14230 -144  14233 0

c  -1+1 --> 0
c    ( b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0 ∧  p_144) -> (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧ -b^{24, 7}_0)
c  in CNF:
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_2
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_1
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_0
c  in DIMACS:
-14228  14229 -14230 -144 -14231 0
-14228  14229 -14230 -144 -14232 0
-14228  14229 -14230 -144 -14233 0

c  0+1 --> 1
c    (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧  p_144) -> (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0)
c  in CNF:
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_2
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_1
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨  b^{24, 7}_0
c  in DIMACS:
 14228  14229  14230 -144 -14231 0
 14228  14229  14230 -144 -14232 0
 14228  14229  14230 -144  14233 0

c  1+1 --> 2
c    (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0 ∧  p_144) -> (-b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0)
c  in CNF:
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_2
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨  b^{24, 7}_1
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ -p_144 ∨ -b^{24, 7}_0
c  in DIMACS:
 14228  14229 -14230 -144 -14231 0
 14228  14229 -14230 -144  14232 0
 14228  14229 -14230 -144 -14233 0

c  2+1 --> break 
c    (-b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧  p_144) -> break
c  in CNF:
c     b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 14228 -14229  14230 -144 1162 0


c  2-1 --> 1
c    (-b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧ -p_144) -> (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0)
c  in CNF:
c     b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_2
c     b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_1
c     b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨  b^{24, 7}_0
c  in DIMACS:
 14228 -14229  14230  144 -14231 0
 14228 -14229  14230  144 -14232 0
 14228 -14229  14230  144  14233 0

c  1-1 --> 0
c    (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0 ∧ -p_144) -> (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧ -b^{24, 7}_0)
c  in CNF:
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_2
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_1
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_0
c  in DIMACS:
 14228  14229 -14230  144 -14231 0
 14228  14229 -14230  144 -14232 0
 14228  14229 -14230  144 -14233 0

c  0-1 --> -1
c    (-b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧ -p_144) -> ( b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0)
c  in CNF:
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨  b^{24, 7}_2
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_1
c     b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨  b^{24, 7}_0
c  in DIMACS:
 14228  14229  14230  144  14231 0
 14228  14229  14230  144 -14232 0
 14228  14229  14230  144  14233 0

c  -1-1 --> -2
c    ( b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧  b^{24, 6}_0 ∧ -p_144) -> ( b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0)
c  in CNF:
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨  b^{24, 7}_2
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨  b^{24, 7}_1
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨  p_144 ∨ -b^{24, 7}_0
c  in DIMACS:
-14228  14229 -14230  144  14231 0
-14228  14229 -14230  144  14232 0
-14228  14229 -14230  144 -14233 0

c  -2-1 --> break 
c    ( b^{24, 6}_2 ∧  b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨  b^{24, 6}_0 ∨  p_144 ∨ break
c  in DIMACS:
-14228 -14229  14230  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 6}_2 ∧ -b^{24, 6}_1 ∧ -b^{24, 6}_0 ∧ true) 
c  in CNF:
c    -b^{24, 6}_2 ∨  b^{24, 6}_1 ∨  b^{24, 6}_0 ∨ false 
c  in DIMACS:
-14228  14229  14230  0

c  3 does not represent an automaton state.
c    -(-b^{24, 6}_2 ∧  b^{24, 6}_1 ∧  b^{24, 6}_0 ∧ true) 
c  in CNF:
c     b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ false 
c  in DIMACS:
 14228 -14229 -14230  0
c  -3 does not represent an automaton state.
c    -( b^{24, 6}_2 ∧  b^{24, 6}_1 ∧  b^{24, 6}_0 ∧ true) 
c  in CNF:
c    -b^{24, 6}_2 ∨ -b^{24, 6}_1 ∨ -b^{24, 6}_0 ∨ false 
c  in DIMACS:
-14228 -14229 -14230  0

c i = 7
c  -2+1 --> -1
c    ( b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧  p_168) -> ( b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0)
c  in CNF:
c    -b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨  b^{24, 8}_2
c    -b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_1
c    -b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨  b^{24, 8}_0
c  in DIMACS:
-14231 -14232  14233 -168  14234 0
-14231 -14232  14233 -168 -14235 0
-14231 -14232  14233 -168  14236 0

c  -1+1 --> 0
c    ( b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0 ∧  p_168) -> (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧ -b^{24, 8}_0)
c  in CNF:
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_2
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_1
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_0
c  in DIMACS:
-14231  14232 -14233 -168 -14234 0
-14231  14232 -14233 -168 -14235 0
-14231  14232 -14233 -168 -14236 0

c  0+1 --> 1
c    (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧  p_168) -> (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0)
c  in CNF:
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_2
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_1
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨  b^{24, 8}_0
c  in DIMACS:
 14231  14232  14233 -168 -14234 0
 14231  14232  14233 -168 -14235 0
 14231  14232  14233 -168  14236 0

c  1+1 --> 2
c    (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0 ∧  p_168) -> (-b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0)
c  in CNF:
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_2
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨  b^{24, 8}_1
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ -p_168 ∨ -b^{24, 8}_0
c  in DIMACS:
 14231  14232 -14233 -168 -14234 0
 14231  14232 -14233 -168  14235 0
 14231  14232 -14233 -168 -14236 0

c  2+1 --> break 
c    (-b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧  p_168) -> break
c  in CNF:
c     b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 14231 -14232  14233 -168 1162 0


c  2-1 --> 1
c    (-b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧ -p_168) -> (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0)
c  in CNF:
c     b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_2
c     b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_1
c     b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨  b^{24, 8}_0
c  in DIMACS:
 14231 -14232  14233  168 -14234 0
 14231 -14232  14233  168 -14235 0
 14231 -14232  14233  168  14236 0

c  1-1 --> 0
c    (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0 ∧ -p_168) -> (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧ -b^{24, 8}_0)
c  in CNF:
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_2
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_1
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_0
c  in DIMACS:
 14231  14232 -14233  168 -14234 0
 14231  14232 -14233  168 -14235 0
 14231  14232 -14233  168 -14236 0

c  0-1 --> -1
c    (-b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧ -p_168) -> ( b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0)
c  in CNF:
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨  b^{24, 8}_2
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_1
c     b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨  b^{24, 8}_0
c  in DIMACS:
 14231  14232  14233  168  14234 0
 14231  14232  14233  168 -14235 0
 14231  14232  14233  168  14236 0

c  -1-1 --> -2
c    ( b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧  b^{24, 7}_0 ∧ -p_168) -> ( b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0)
c  in CNF:
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨  b^{24, 8}_2
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨  b^{24, 8}_1
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨  p_168 ∨ -b^{24, 8}_0
c  in DIMACS:
-14231  14232 -14233  168  14234 0
-14231  14232 -14233  168  14235 0
-14231  14232 -14233  168 -14236 0

c  -2-1 --> break 
c    ( b^{24, 7}_2 ∧  b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨  b^{24, 7}_0 ∨  p_168 ∨ break
c  in DIMACS:
-14231 -14232  14233  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 7}_2 ∧ -b^{24, 7}_1 ∧ -b^{24, 7}_0 ∧ true) 
c  in CNF:
c    -b^{24, 7}_2 ∨  b^{24, 7}_1 ∨  b^{24, 7}_0 ∨ false 
c  in DIMACS:
-14231  14232  14233  0

c  3 does not represent an automaton state.
c    -(-b^{24, 7}_2 ∧  b^{24, 7}_1 ∧  b^{24, 7}_0 ∧ true) 
c  in CNF:
c     b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ false 
c  in DIMACS:
 14231 -14232 -14233  0
c  -3 does not represent an automaton state.
c    -( b^{24, 7}_2 ∧  b^{24, 7}_1 ∧  b^{24, 7}_0 ∧ true) 
c  in CNF:
c    -b^{24, 7}_2 ∨ -b^{24, 7}_1 ∨ -b^{24, 7}_0 ∨ false 
c  in DIMACS:
-14231 -14232 -14233  0

c i = 8
c  -2+1 --> -1
c    ( b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧  p_192) -> ( b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0)
c  in CNF:
c    -b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨  b^{24, 9}_2
c    -b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_1
c    -b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨  b^{24, 9}_0
c  in DIMACS:
-14234 -14235  14236 -192  14237 0
-14234 -14235  14236 -192 -14238 0
-14234 -14235  14236 -192  14239 0

c  -1+1 --> 0
c    ( b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0 ∧  p_192) -> (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧ -b^{24, 9}_0)
c  in CNF:
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_2
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_1
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_0
c  in DIMACS:
-14234  14235 -14236 -192 -14237 0
-14234  14235 -14236 -192 -14238 0
-14234  14235 -14236 -192 -14239 0

c  0+1 --> 1
c    (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧  p_192) -> (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0)
c  in CNF:
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_2
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_1
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨  b^{24, 9}_0
c  in DIMACS:
 14234  14235  14236 -192 -14237 0
 14234  14235  14236 -192 -14238 0
 14234  14235  14236 -192  14239 0

c  1+1 --> 2
c    (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0 ∧  p_192) -> (-b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0)
c  in CNF:
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_2
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨  b^{24, 9}_1
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ -p_192 ∨ -b^{24, 9}_0
c  in DIMACS:
 14234  14235 -14236 -192 -14237 0
 14234  14235 -14236 -192  14238 0
 14234  14235 -14236 -192 -14239 0

c  2+1 --> break 
c    (-b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧  p_192) -> break
c  in CNF:
c     b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 14234 -14235  14236 -192 1162 0


c  2-1 --> 1
c    (-b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧ -p_192) -> (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0)
c  in CNF:
c     b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_2
c     b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_1
c     b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨  b^{24, 9}_0
c  in DIMACS:
 14234 -14235  14236  192 -14237 0
 14234 -14235  14236  192 -14238 0
 14234 -14235  14236  192  14239 0

c  1-1 --> 0
c    (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0 ∧ -p_192) -> (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧ -b^{24, 9}_0)
c  in CNF:
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_2
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_1
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_0
c  in DIMACS:
 14234  14235 -14236  192 -14237 0
 14234  14235 -14236  192 -14238 0
 14234  14235 -14236  192 -14239 0

c  0-1 --> -1
c    (-b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧ -p_192) -> ( b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0)
c  in CNF:
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨  b^{24, 9}_2
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_1
c     b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨  b^{24, 9}_0
c  in DIMACS:
 14234  14235  14236  192  14237 0
 14234  14235  14236  192 -14238 0
 14234  14235  14236  192  14239 0

c  -1-1 --> -2
c    ( b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧  b^{24, 8}_0 ∧ -p_192) -> ( b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0)
c  in CNF:
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨  b^{24, 9}_2
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨  b^{24, 9}_1
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨  p_192 ∨ -b^{24, 9}_0
c  in DIMACS:
-14234  14235 -14236  192  14237 0
-14234  14235 -14236  192  14238 0
-14234  14235 -14236  192 -14239 0

c  -2-1 --> break 
c    ( b^{24, 8}_2 ∧  b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨  b^{24, 8}_0 ∨  p_192 ∨ break
c  in DIMACS:
-14234 -14235  14236  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 8}_2 ∧ -b^{24, 8}_1 ∧ -b^{24, 8}_0 ∧ true) 
c  in CNF:
c    -b^{24, 8}_2 ∨  b^{24, 8}_1 ∨  b^{24, 8}_0 ∨ false 
c  in DIMACS:
-14234  14235  14236  0

c  3 does not represent an automaton state.
c    -(-b^{24, 8}_2 ∧  b^{24, 8}_1 ∧  b^{24, 8}_0 ∧ true) 
c  in CNF:
c     b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ false 
c  in DIMACS:
 14234 -14235 -14236  0
c  -3 does not represent an automaton state.
c    -( b^{24, 8}_2 ∧  b^{24, 8}_1 ∧  b^{24, 8}_0 ∧ true) 
c  in CNF:
c    -b^{24, 8}_2 ∨ -b^{24, 8}_1 ∨ -b^{24, 8}_0 ∨ false 
c  in DIMACS:
-14234 -14235 -14236  0

c i = 9
c  -2+1 --> -1
c    ( b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧  p_216) -> ( b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0)
c  in CNF:
c    -b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨  b^{24, 10}_2
c    -b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_1
c    -b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨  b^{24, 10}_0
c  in DIMACS:
-14237 -14238  14239 -216  14240 0
-14237 -14238  14239 -216 -14241 0
-14237 -14238  14239 -216  14242 0

c  -1+1 --> 0
c    ( b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0 ∧  p_216) -> (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧ -b^{24, 10}_0)
c  in CNF:
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_2
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_1
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_0
c  in DIMACS:
-14237  14238 -14239 -216 -14240 0
-14237  14238 -14239 -216 -14241 0
-14237  14238 -14239 -216 -14242 0

c  0+1 --> 1
c    (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧  p_216) -> (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0)
c  in CNF:
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_2
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_1
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨  b^{24, 10}_0
c  in DIMACS:
 14237  14238  14239 -216 -14240 0
 14237  14238  14239 -216 -14241 0
 14237  14238  14239 -216  14242 0

c  1+1 --> 2
c    (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0 ∧  p_216) -> (-b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0)
c  in CNF:
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_2
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨  b^{24, 10}_1
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ -p_216 ∨ -b^{24, 10}_0
c  in DIMACS:
 14237  14238 -14239 -216 -14240 0
 14237  14238 -14239 -216  14241 0
 14237  14238 -14239 -216 -14242 0

c  2+1 --> break 
c    (-b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧  p_216) -> break
c  in CNF:
c     b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 14237 -14238  14239 -216 1162 0


c  2-1 --> 1
c    (-b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧ -p_216) -> (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0)
c  in CNF:
c     b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_2
c     b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_1
c     b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨  b^{24, 10}_0
c  in DIMACS:
 14237 -14238  14239  216 -14240 0
 14237 -14238  14239  216 -14241 0
 14237 -14238  14239  216  14242 0

c  1-1 --> 0
c    (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0 ∧ -p_216) -> (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧ -b^{24, 10}_0)
c  in CNF:
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_2
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_1
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_0
c  in DIMACS:
 14237  14238 -14239  216 -14240 0
 14237  14238 -14239  216 -14241 0
 14237  14238 -14239  216 -14242 0

c  0-1 --> -1
c    (-b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧ -p_216) -> ( b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0)
c  in CNF:
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨  b^{24, 10}_2
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_1
c     b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨  b^{24, 10}_0
c  in DIMACS:
 14237  14238  14239  216  14240 0
 14237  14238  14239  216 -14241 0
 14237  14238  14239  216  14242 0

c  -1-1 --> -2
c    ( b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧  b^{24, 9}_0 ∧ -p_216) -> ( b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0)
c  in CNF:
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨  b^{24, 10}_2
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨  b^{24, 10}_1
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨  p_216 ∨ -b^{24, 10}_0
c  in DIMACS:
-14237  14238 -14239  216  14240 0
-14237  14238 -14239  216  14241 0
-14237  14238 -14239  216 -14242 0

c  -2-1 --> break 
c    ( b^{24, 9}_2 ∧  b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨  b^{24, 9}_0 ∨  p_216 ∨ break
c  in DIMACS:
-14237 -14238  14239  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 9}_2 ∧ -b^{24, 9}_1 ∧ -b^{24, 9}_0 ∧ true) 
c  in CNF:
c    -b^{24, 9}_2 ∨  b^{24, 9}_1 ∨  b^{24, 9}_0 ∨ false 
c  in DIMACS:
-14237  14238  14239  0

c  3 does not represent an automaton state.
c    -(-b^{24, 9}_2 ∧  b^{24, 9}_1 ∧  b^{24, 9}_0 ∧ true) 
c  in CNF:
c     b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ false 
c  in DIMACS:
 14237 -14238 -14239  0
c  -3 does not represent an automaton state.
c    -( b^{24, 9}_2 ∧  b^{24, 9}_1 ∧  b^{24, 9}_0 ∧ true) 
c  in CNF:
c    -b^{24, 9}_2 ∨ -b^{24, 9}_1 ∨ -b^{24, 9}_0 ∨ false 
c  in DIMACS:
-14237 -14238 -14239  0

c i = 10
c  -2+1 --> -1
c    ( b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧  p_240) -> ( b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0)
c  in CNF:
c    -b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨  b^{24, 11}_2
c    -b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_1
c    -b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨  b^{24, 11}_0
c  in DIMACS:
-14240 -14241  14242 -240  14243 0
-14240 -14241  14242 -240 -14244 0
-14240 -14241  14242 -240  14245 0

c  -1+1 --> 0
c    ( b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0 ∧  p_240) -> (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧ -b^{24, 11}_0)
c  in CNF:
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_2
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_1
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_0
c  in DIMACS:
-14240  14241 -14242 -240 -14243 0
-14240  14241 -14242 -240 -14244 0
-14240  14241 -14242 -240 -14245 0

c  0+1 --> 1
c    (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧  p_240) -> (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0)
c  in CNF:
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_2
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_1
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨  b^{24, 11}_0
c  in DIMACS:
 14240  14241  14242 -240 -14243 0
 14240  14241  14242 -240 -14244 0
 14240  14241  14242 -240  14245 0

c  1+1 --> 2
c    (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0 ∧  p_240) -> (-b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0)
c  in CNF:
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_2
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨  b^{24, 11}_1
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ -p_240 ∨ -b^{24, 11}_0
c  in DIMACS:
 14240  14241 -14242 -240 -14243 0
 14240  14241 -14242 -240  14244 0
 14240  14241 -14242 -240 -14245 0

c  2+1 --> break 
c    (-b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧  p_240) -> break
c  in CNF:
c     b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 14240 -14241  14242 -240 1162 0


c  2-1 --> 1
c    (-b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧ -p_240) -> (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0)
c  in CNF:
c     b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_2
c     b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_1
c     b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨  b^{24, 11}_0
c  in DIMACS:
 14240 -14241  14242  240 -14243 0
 14240 -14241  14242  240 -14244 0
 14240 -14241  14242  240  14245 0

c  1-1 --> 0
c    (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0 ∧ -p_240) -> (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧ -b^{24, 11}_0)
c  in CNF:
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_2
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_1
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_0
c  in DIMACS:
 14240  14241 -14242  240 -14243 0
 14240  14241 -14242  240 -14244 0
 14240  14241 -14242  240 -14245 0

c  0-1 --> -1
c    (-b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧ -p_240) -> ( b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0)
c  in CNF:
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨  b^{24, 11}_2
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_1
c     b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨  b^{24, 11}_0
c  in DIMACS:
 14240  14241  14242  240  14243 0
 14240  14241  14242  240 -14244 0
 14240  14241  14242  240  14245 0

c  -1-1 --> -2
c    ( b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧  b^{24, 10}_0 ∧ -p_240) -> ( b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0)
c  in CNF:
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨  b^{24, 11}_2
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨  b^{24, 11}_1
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨  p_240 ∨ -b^{24, 11}_0
c  in DIMACS:
-14240  14241 -14242  240  14243 0
-14240  14241 -14242  240  14244 0
-14240  14241 -14242  240 -14245 0

c  -2-1 --> break 
c    ( b^{24, 10}_2 ∧  b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨  b^{24, 10}_0 ∨  p_240 ∨ break
c  in DIMACS:
-14240 -14241  14242  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 10}_2 ∧ -b^{24, 10}_1 ∧ -b^{24, 10}_0 ∧ true) 
c  in CNF:
c    -b^{24, 10}_2 ∨  b^{24, 10}_1 ∨  b^{24, 10}_0 ∨ false 
c  in DIMACS:
-14240  14241  14242  0

c  3 does not represent an automaton state.
c    -(-b^{24, 10}_2 ∧  b^{24, 10}_1 ∧  b^{24, 10}_0 ∧ true) 
c  in CNF:
c     b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ false 
c  in DIMACS:
 14240 -14241 -14242  0
c  -3 does not represent an automaton state.
c    -( b^{24, 10}_2 ∧  b^{24, 10}_1 ∧  b^{24, 10}_0 ∧ true) 
c  in CNF:
c    -b^{24, 10}_2 ∨ -b^{24, 10}_1 ∨ -b^{24, 10}_0 ∨ false 
c  in DIMACS:
-14240 -14241 -14242  0

c i = 11
c  -2+1 --> -1
c    ( b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧  p_264) -> ( b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0)
c  in CNF:
c    -b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨  b^{24, 12}_2
c    -b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_1
c    -b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨  b^{24, 12}_0
c  in DIMACS:
-14243 -14244  14245 -264  14246 0
-14243 -14244  14245 -264 -14247 0
-14243 -14244  14245 -264  14248 0

c  -1+1 --> 0
c    ( b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0 ∧  p_264) -> (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧ -b^{24, 12}_0)
c  in CNF:
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_2
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_1
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_0
c  in DIMACS:
-14243  14244 -14245 -264 -14246 0
-14243  14244 -14245 -264 -14247 0
-14243  14244 -14245 -264 -14248 0

c  0+1 --> 1
c    (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧  p_264) -> (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0)
c  in CNF:
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_2
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_1
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨  b^{24, 12}_0
c  in DIMACS:
 14243  14244  14245 -264 -14246 0
 14243  14244  14245 -264 -14247 0
 14243  14244  14245 -264  14248 0

c  1+1 --> 2
c    (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0 ∧  p_264) -> (-b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0)
c  in CNF:
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_2
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨  b^{24, 12}_1
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ -p_264 ∨ -b^{24, 12}_0
c  in DIMACS:
 14243  14244 -14245 -264 -14246 0
 14243  14244 -14245 -264  14247 0
 14243  14244 -14245 -264 -14248 0

c  2+1 --> break 
c    (-b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧  p_264) -> break
c  in CNF:
c     b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 14243 -14244  14245 -264 1162 0


c  2-1 --> 1
c    (-b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧ -p_264) -> (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0)
c  in CNF:
c     b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_2
c     b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_1
c     b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨  b^{24, 12}_0
c  in DIMACS:
 14243 -14244  14245  264 -14246 0
 14243 -14244  14245  264 -14247 0
 14243 -14244  14245  264  14248 0

c  1-1 --> 0
c    (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0 ∧ -p_264) -> (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧ -b^{24, 12}_0)
c  in CNF:
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_2
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_1
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_0
c  in DIMACS:
 14243  14244 -14245  264 -14246 0
 14243  14244 -14245  264 -14247 0
 14243  14244 -14245  264 -14248 0

c  0-1 --> -1
c    (-b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧ -p_264) -> ( b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0)
c  in CNF:
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨  b^{24, 12}_2
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_1
c     b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨  b^{24, 12}_0
c  in DIMACS:
 14243  14244  14245  264  14246 0
 14243  14244  14245  264 -14247 0
 14243  14244  14245  264  14248 0

c  -1-1 --> -2
c    ( b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧  b^{24, 11}_0 ∧ -p_264) -> ( b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0)
c  in CNF:
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨  b^{24, 12}_2
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨  b^{24, 12}_1
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨  p_264 ∨ -b^{24, 12}_0
c  in DIMACS:
-14243  14244 -14245  264  14246 0
-14243  14244 -14245  264  14247 0
-14243  14244 -14245  264 -14248 0

c  -2-1 --> break 
c    ( b^{24, 11}_2 ∧  b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨  b^{24, 11}_0 ∨  p_264 ∨ break
c  in DIMACS:
-14243 -14244  14245  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 11}_2 ∧ -b^{24, 11}_1 ∧ -b^{24, 11}_0 ∧ true) 
c  in CNF:
c    -b^{24, 11}_2 ∨  b^{24, 11}_1 ∨  b^{24, 11}_0 ∨ false 
c  in DIMACS:
-14243  14244  14245  0

c  3 does not represent an automaton state.
c    -(-b^{24, 11}_2 ∧  b^{24, 11}_1 ∧  b^{24, 11}_0 ∧ true) 
c  in CNF:
c     b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ false 
c  in DIMACS:
 14243 -14244 -14245  0
c  -3 does not represent an automaton state.
c    -( b^{24, 11}_2 ∧  b^{24, 11}_1 ∧  b^{24, 11}_0 ∧ true) 
c  in CNF:
c    -b^{24, 11}_2 ∨ -b^{24, 11}_1 ∨ -b^{24, 11}_0 ∨ false 
c  in DIMACS:
-14243 -14244 -14245  0

c i = 12
c  -2+1 --> -1
c    ( b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧  p_288) -> ( b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0)
c  in CNF:
c    -b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨  b^{24, 13}_2
c    -b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_1
c    -b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨  b^{24, 13}_0
c  in DIMACS:
-14246 -14247  14248 -288  14249 0
-14246 -14247  14248 -288 -14250 0
-14246 -14247  14248 -288  14251 0

c  -1+1 --> 0
c    ( b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0 ∧  p_288) -> (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧ -b^{24, 13}_0)
c  in CNF:
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_2
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_1
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_0
c  in DIMACS:
-14246  14247 -14248 -288 -14249 0
-14246  14247 -14248 -288 -14250 0
-14246  14247 -14248 -288 -14251 0

c  0+1 --> 1
c    (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧  p_288) -> (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0)
c  in CNF:
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_2
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_1
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨  b^{24, 13}_0
c  in DIMACS:
 14246  14247  14248 -288 -14249 0
 14246  14247  14248 -288 -14250 0
 14246  14247  14248 -288  14251 0

c  1+1 --> 2
c    (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0 ∧  p_288) -> (-b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0)
c  in CNF:
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_2
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨  b^{24, 13}_1
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ -p_288 ∨ -b^{24, 13}_0
c  in DIMACS:
 14246  14247 -14248 -288 -14249 0
 14246  14247 -14248 -288  14250 0
 14246  14247 -14248 -288 -14251 0

c  2+1 --> break 
c    (-b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧  p_288) -> break
c  in CNF:
c     b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 14246 -14247  14248 -288 1162 0


c  2-1 --> 1
c    (-b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧ -p_288) -> (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0)
c  in CNF:
c     b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_2
c     b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_1
c     b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨  b^{24, 13}_0
c  in DIMACS:
 14246 -14247  14248  288 -14249 0
 14246 -14247  14248  288 -14250 0
 14246 -14247  14248  288  14251 0

c  1-1 --> 0
c    (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0 ∧ -p_288) -> (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧ -b^{24, 13}_0)
c  in CNF:
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_2
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_1
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_0
c  in DIMACS:
 14246  14247 -14248  288 -14249 0
 14246  14247 -14248  288 -14250 0
 14246  14247 -14248  288 -14251 0

c  0-1 --> -1
c    (-b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧ -p_288) -> ( b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0)
c  in CNF:
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨  b^{24, 13}_2
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_1
c     b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨  b^{24, 13}_0
c  in DIMACS:
 14246  14247  14248  288  14249 0
 14246  14247  14248  288 -14250 0
 14246  14247  14248  288  14251 0

c  -1-1 --> -2
c    ( b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧  b^{24, 12}_0 ∧ -p_288) -> ( b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0)
c  in CNF:
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨  b^{24, 13}_2
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨  b^{24, 13}_1
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨  p_288 ∨ -b^{24, 13}_0
c  in DIMACS:
-14246  14247 -14248  288  14249 0
-14246  14247 -14248  288  14250 0
-14246  14247 -14248  288 -14251 0

c  -2-1 --> break 
c    ( b^{24, 12}_2 ∧  b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨  b^{24, 12}_0 ∨  p_288 ∨ break
c  in DIMACS:
-14246 -14247  14248  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 12}_2 ∧ -b^{24, 12}_1 ∧ -b^{24, 12}_0 ∧ true) 
c  in CNF:
c    -b^{24, 12}_2 ∨  b^{24, 12}_1 ∨  b^{24, 12}_0 ∨ false 
c  in DIMACS:
-14246  14247  14248  0

c  3 does not represent an automaton state.
c    -(-b^{24, 12}_2 ∧  b^{24, 12}_1 ∧  b^{24, 12}_0 ∧ true) 
c  in CNF:
c     b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ false 
c  in DIMACS:
 14246 -14247 -14248  0
c  -3 does not represent an automaton state.
c    -( b^{24, 12}_2 ∧  b^{24, 12}_1 ∧  b^{24, 12}_0 ∧ true) 
c  in CNF:
c    -b^{24, 12}_2 ∨ -b^{24, 12}_1 ∨ -b^{24, 12}_0 ∨ false 
c  in DIMACS:
-14246 -14247 -14248  0

c i = 13
c  -2+1 --> -1
c    ( b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧  p_312) -> ( b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0)
c  in CNF:
c    -b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨  b^{24, 14}_2
c    -b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_1
c    -b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨  b^{24, 14}_0
c  in DIMACS:
-14249 -14250  14251 -312  14252 0
-14249 -14250  14251 -312 -14253 0
-14249 -14250  14251 -312  14254 0

c  -1+1 --> 0
c    ( b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0 ∧  p_312) -> (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧ -b^{24, 14}_0)
c  in CNF:
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_2
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_1
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_0
c  in DIMACS:
-14249  14250 -14251 -312 -14252 0
-14249  14250 -14251 -312 -14253 0
-14249  14250 -14251 -312 -14254 0

c  0+1 --> 1
c    (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧  p_312) -> (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0)
c  in CNF:
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_2
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_1
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨  b^{24, 14}_0
c  in DIMACS:
 14249  14250  14251 -312 -14252 0
 14249  14250  14251 -312 -14253 0
 14249  14250  14251 -312  14254 0

c  1+1 --> 2
c    (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0 ∧  p_312) -> (-b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0)
c  in CNF:
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_2
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨  b^{24, 14}_1
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ -p_312 ∨ -b^{24, 14}_0
c  in DIMACS:
 14249  14250 -14251 -312 -14252 0
 14249  14250 -14251 -312  14253 0
 14249  14250 -14251 -312 -14254 0

c  2+1 --> break 
c    (-b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧  p_312) -> break
c  in CNF:
c     b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 14249 -14250  14251 -312 1162 0


c  2-1 --> 1
c    (-b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧ -p_312) -> (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0)
c  in CNF:
c     b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_2
c     b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_1
c     b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨  b^{24, 14}_0
c  in DIMACS:
 14249 -14250  14251  312 -14252 0
 14249 -14250  14251  312 -14253 0
 14249 -14250  14251  312  14254 0

c  1-1 --> 0
c    (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0 ∧ -p_312) -> (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧ -b^{24, 14}_0)
c  in CNF:
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_2
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_1
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_0
c  in DIMACS:
 14249  14250 -14251  312 -14252 0
 14249  14250 -14251  312 -14253 0
 14249  14250 -14251  312 -14254 0

c  0-1 --> -1
c    (-b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧ -p_312) -> ( b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0)
c  in CNF:
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨  b^{24, 14}_2
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_1
c     b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨  b^{24, 14}_0
c  in DIMACS:
 14249  14250  14251  312  14252 0
 14249  14250  14251  312 -14253 0
 14249  14250  14251  312  14254 0

c  -1-1 --> -2
c    ( b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧  b^{24, 13}_0 ∧ -p_312) -> ( b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0)
c  in CNF:
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨  b^{24, 14}_2
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨  b^{24, 14}_1
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨  p_312 ∨ -b^{24, 14}_0
c  in DIMACS:
-14249  14250 -14251  312  14252 0
-14249  14250 -14251  312  14253 0
-14249  14250 -14251  312 -14254 0

c  -2-1 --> break 
c    ( b^{24, 13}_2 ∧  b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨  b^{24, 13}_0 ∨  p_312 ∨ break
c  in DIMACS:
-14249 -14250  14251  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 13}_2 ∧ -b^{24, 13}_1 ∧ -b^{24, 13}_0 ∧ true) 
c  in CNF:
c    -b^{24, 13}_2 ∨  b^{24, 13}_1 ∨  b^{24, 13}_0 ∨ false 
c  in DIMACS:
-14249  14250  14251  0

c  3 does not represent an automaton state.
c    -(-b^{24, 13}_2 ∧  b^{24, 13}_1 ∧  b^{24, 13}_0 ∧ true) 
c  in CNF:
c     b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ false 
c  in DIMACS:
 14249 -14250 -14251  0
c  -3 does not represent an automaton state.
c    -( b^{24, 13}_2 ∧  b^{24, 13}_1 ∧  b^{24, 13}_0 ∧ true) 
c  in CNF:
c    -b^{24, 13}_2 ∨ -b^{24, 13}_1 ∨ -b^{24, 13}_0 ∨ false 
c  in DIMACS:
-14249 -14250 -14251  0

c i = 14
c  -2+1 --> -1
c    ( b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧  p_336) -> ( b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0)
c  in CNF:
c    -b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨  b^{24, 15}_2
c    -b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_1
c    -b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨  b^{24, 15}_0
c  in DIMACS:
-14252 -14253  14254 -336  14255 0
-14252 -14253  14254 -336 -14256 0
-14252 -14253  14254 -336  14257 0

c  -1+1 --> 0
c    ( b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0 ∧  p_336) -> (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧ -b^{24, 15}_0)
c  in CNF:
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_2
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_1
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_0
c  in DIMACS:
-14252  14253 -14254 -336 -14255 0
-14252  14253 -14254 -336 -14256 0
-14252  14253 -14254 -336 -14257 0

c  0+1 --> 1
c    (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧  p_336) -> (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0)
c  in CNF:
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_2
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_1
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨  b^{24, 15}_0
c  in DIMACS:
 14252  14253  14254 -336 -14255 0
 14252  14253  14254 -336 -14256 0
 14252  14253  14254 -336  14257 0

c  1+1 --> 2
c    (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0 ∧  p_336) -> (-b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0)
c  in CNF:
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_2
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨  b^{24, 15}_1
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ -p_336 ∨ -b^{24, 15}_0
c  in DIMACS:
 14252  14253 -14254 -336 -14255 0
 14252  14253 -14254 -336  14256 0
 14252  14253 -14254 -336 -14257 0

c  2+1 --> break 
c    (-b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧  p_336) -> break
c  in CNF:
c     b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 14252 -14253  14254 -336 1162 0


c  2-1 --> 1
c    (-b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧ -p_336) -> (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0)
c  in CNF:
c     b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_2
c     b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_1
c     b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨  b^{24, 15}_0
c  in DIMACS:
 14252 -14253  14254  336 -14255 0
 14252 -14253  14254  336 -14256 0
 14252 -14253  14254  336  14257 0

c  1-1 --> 0
c    (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0 ∧ -p_336) -> (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧ -b^{24, 15}_0)
c  in CNF:
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_2
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_1
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_0
c  in DIMACS:
 14252  14253 -14254  336 -14255 0
 14252  14253 -14254  336 -14256 0
 14252  14253 -14254  336 -14257 0

c  0-1 --> -1
c    (-b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧ -p_336) -> ( b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0)
c  in CNF:
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨  b^{24, 15}_2
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_1
c     b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨  b^{24, 15}_0
c  in DIMACS:
 14252  14253  14254  336  14255 0
 14252  14253  14254  336 -14256 0
 14252  14253  14254  336  14257 0

c  -1-1 --> -2
c    ( b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧  b^{24, 14}_0 ∧ -p_336) -> ( b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0)
c  in CNF:
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨  b^{24, 15}_2
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨  b^{24, 15}_1
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨  p_336 ∨ -b^{24, 15}_0
c  in DIMACS:
-14252  14253 -14254  336  14255 0
-14252  14253 -14254  336  14256 0
-14252  14253 -14254  336 -14257 0

c  -2-1 --> break 
c    ( b^{24, 14}_2 ∧  b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨  b^{24, 14}_0 ∨  p_336 ∨ break
c  in DIMACS:
-14252 -14253  14254  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 14}_2 ∧ -b^{24, 14}_1 ∧ -b^{24, 14}_0 ∧ true) 
c  in CNF:
c    -b^{24, 14}_2 ∨  b^{24, 14}_1 ∨  b^{24, 14}_0 ∨ false 
c  in DIMACS:
-14252  14253  14254  0

c  3 does not represent an automaton state.
c    -(-b^{24, 14}_2 ∧  b^{24, 14}_1 ∧  b^{24, 14}_0 ∧ true) 
c  in CNF:
c     b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ false 
c  in DIMACS:
 14252 -14253 -14254  0
c  -3 does not represent an automaton state.
c    -( b^{24, 14}_2 ∧  b^{24, 14}_1 ∧  b^{24, 14}_0 ∧ true) 
c  in CNF:
c    -b^{24, 14}_2 ∨ -b^{24, 14}_1 ∨ -b^{24, 14}_0 ∨ false 
c  in DIMACS:
-14252 -14253 -14254  0

c i = 15
c  -2+1 --> -1
c    ( b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧  p_360) -> ( b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0)
c  in CNF:
c    -b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨  b^{24, 16}_2
c    -b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_1
c    -b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨  b^{24, 16}_0
c  in DIMACS:
-14255 -14256  14257 -360  14258 0
-14255 -14256  14257 -360 -14259 0
-14255 -14256  14257 -360  14260 0

c  -1+1 --> 0
c    ( b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0 ∧  p_360) -> (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧ -b^{24, 16}_0)
c  in CNF:
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_2
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_1
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_0
c  in DIMACS:
-14255  14256 -14257 -360 -14258 0
-14255  14256 -14257 -360 -14259 0
-14255  14256 -14257 -360 -14260 0

c  0+1 --> 1
c    (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧  p_360) -> (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0)
c  in CNF:
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_2
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_1
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨  b^{24, 16}_0
c  in DIMACS:
 14255  14256  14257 -360 -14258 0
 14255  14256  14257 -360 -14259 0
 14255  14256  14257 -360  14260 0

c  1+1 --> 2
c    (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0 ∧  p_360) -> (-b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0)
c  in CNF:
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_2
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨  b^{24, 16}_1
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ -p_360 ∨ -b^{24, 16}_0
c  in DIMACS:
 14255  14256 -14257 -360 -14258 0
 14255  14256 -14257 -360  14259 0
 14255  14256 -14257 -360 -14260 0

c  2+1 --> break 
c    (-b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧  p_360) -> break
c  in CNF:
c     b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 14255 -14256  14257 -360 1162 0


c  2-1 --> 1
c    (-b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧ -p_360) -> (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0)
c  in CNF:
c     b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_2
c     b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_1
c     b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨  b^{24, 16}_0
c  in DIMACS:
 14255 -14256  14257  360 -14258 0
 14255 -14256  14257  360 -14259 0
 14255 -14256  14257  360  14260 0

c  1-1 --> 0
c    (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0 ∧ -p_360) -> (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧ -b^{24, 16}_0)
c  in CNF:
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_2
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_1
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_0
c  in DIMACS:
 14255  14256 -14257  360 -14258 0
 14255  14256 -14257  360 -14259 0
 14255  14256 -14257  360 -14260 0

c  0-1 --> -1
c    (-b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧ -p_360) -> ( b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0)
c  in CNF:
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨  b^{24, 16}_2
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_1
c     b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨  b^{24, 16}_0
c  in DIMACS:
 14255  14256  14257  360  14258 0
 14255  14256  14257  360 -14259 0
 14255  14256  14257  360  14260 0

c  -1-1 --> -2
c    ( b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧  b^{24, 15}_0 ∧ -p_360) -> ( b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0)
c  in CNF:
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨  b^{24, 16}_2
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨  b^{24, 16}_1
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨  p_360 ∨ -b^{24, 16}_0
c  in DIMACS:
-14255  14256 -14257  360  14258 0
-14255  14256 -14257  360  14259 0
-14255  14256 -14257  360 -14260 0

c  -2-1 --> break 
c    ( b^{24, 15}_2 ∧  b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨  b^{24, 15}_0 ∨  p_360 ∨ break
c  in DIMACS:
-14255 -14256  14257  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 15}_2 ∧ -b^{24, 15}_1 ∧ -b^{24, 15}_0 ∧ true) 
c  in CNF:
c    -b^{24, 15}_2 ∨  b^{24, 15}_1 ∨  b^{24, 15}_0 ∨ false 
c  in DIMACS:
-14255  14256  14257  0

c  3 does not represent an automaton state.
c    -(-b^{24, 15}_2 ∧  b^{24, 15}_1 ∧  b^{24, 15}_0 ∧ true) 
c  in CNF:
c     b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ false 
c  in DIMACS:
 14255 -14256 -14257  0
c  -3 does not represent an automaton state.
c    -( b^{24, 15}_2 ∧  b^{24, 15}_1 ∧  b^{24, 15}_0 ∧ true) 
c  in CNF:
c    -b^{24, 15}_2 ∨ -b^{24, 15}_1 ∨ -b^{24, 15}_0 ∨ false 
c  in DIMACS:
-14255 -14256 -14257  0

c i = 16
c  -2+1 --> -1
c    ( b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧  p_384) -> ( b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0)
c  in CNF:
c    -b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨  b^{24, 17}_2
c    -b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_1
c    -b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨  b^{24, 17}_0
c  in DIMACS:
-14258 -14259  14260 -384  14261 0
-14258 -14259  14260 -384 -14262 0
-14258 -14259  14260 -384  14263 0

c  -1+1 --> 0
c    ( b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0 ∧  p_384) -> (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧ -b^{24, 17}_0)
c  in CNF:
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_2
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_1
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_0
c  in DIMACS:
-14258  14259 -14260 -384 -14261 0
-14258  14259 -14260 -384 -14262 0
-14258  14259 -14260 -384 -14263 0

c  0+1 --> 1
c    (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧  p_384) -> (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0)
c  in CNF:
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_2
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_1
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨  b^{24, 17}_0
c  in DIMACS:
 14258  14259  14260 -384 -14261 0
 14258  14259  14260 -384 -14262 0
 14258  14259  14260 -384  14263 0

c  1+1 --> 2
c    (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0 ∧  p_384) -> (-b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0)
c  in CNF:
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_2
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨  b^{24, 17}_1
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ -p_384 ∨ -b^{24, 17}_0
c  in DIMACS:
 14258  14259 -14260 -384 -14261 0
 14258  14259 -14260 -384  14262 0
 14258  14259 -14260 -384 -14263 0

c  2+1 --> break 
c    (-b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧  p_384) -> break
c  in CNF:
c     b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 14258 -14259  14260 -384 1162 0


c  2-1 --> 1
c    (-b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧ -p_384) -> (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0)
c  in CNF:
c     b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_2
c     b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_1
c     b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨  b^{24, 17}_0
c  in DIMACS:
 14258 -14259  14260  384 -14261 0
 14258 -14259  14260  384 -14262 0
 14258 -14259  14260  384  14263 0

c  1-1 --> 0
c    (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0 ∧ -p_384) -> (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧ -b^{24, 17}_0)
c  in CNF:
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_2
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_1
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_0
c  in DIMACS:
 14258  14259 -14260  384 -14261 0
 14258  14259 -14260  384 -14262 0
 14258  14259 -14260  384 -14263 0

c  0-1 --> -1
c    (-b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧ -p_384) -> ( b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0)
c  in CNF:
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨  b^{24, 17}_2
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_1
c     b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨  b^{24, 17}_0
c  in DIMACS:
 14258  14259  14260  384  14261 0
 14258  14259  14260  384 -14262 0
 14258  14259  14260  384  14263 0

c  -1-1 --> -2
c    ( b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧  b^{24, 16}_0 ∧ -p_384) -> ( b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0)
c  in CNF:
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨  b^{24, 17}_2
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨  b^{24, 17}_1
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨  p_384 ∨ -b^{24, 17}_0
c  in DIMACS:
-14258  14259 -14260  384  14261 0
-14258  14259 -14260  384  14262 0
-14258  14259 -14260  384 -14263 0

c  -2-1 --> break 
c    ( b^{24, 16}_2 ∧  b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨  b^{24, 16}_0 ∨  p_384 ∨ break
c  in DIMACS:
-14258 -14259  14260  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 16}_2 ∧ -b^{24, 16}_1 ∧ -b^{24, 16}_0 ∧ true) 
c  in CNF:
c    -b^{24, 16}_2 ∨  b^{24, 16}_1 ∨  b^{24, 16}_0 ∨ false 
c  in DIMACS:
-14258  14259  14260  0

c  3 does not represent an automaton state.
c    -(-b^{24, 16}_2 ∧  b^{24, 16}_1 ∧  b^{24, 16}_0 ∧ true) 
c  in CNF:
c     b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ false 
c  in DIMACS:
 14258 -14259 -14260  0
c  -3 does not represent an automaton state.
c    -( b^{24, 16}_2 ∧  b^{24, 16}_1 ∧  b^{24, 16}_0 ∧ true) 
c  in CNF:
c    -b^{24, 16}_2 ∨ -b^{24, 16}_1 ∨ -b^{24, 16}_0 ∨ false 
c  in DIMACS:
-14258 -14259 -14260  0

c i = 17
c  -2+1 --> -1
c    ( b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧  p_408) -> ( b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0)
c  in CNF:
c    -b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨  b^{24, 18}_2
c    -b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_1
c    -b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨  b^{24, 18}_0
c  in DIMACS:
-14261 -14262  14263 -408  14264 0
-14261 -14262  14263 -408 -14265 0
-14261 -14262  14263 -408  14266 0

c  -1+1 --> 0
c    ( b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0 ∧  p_408) -> (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧ -b^{24, 18}_0)
c  in CNF:
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_2
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_1
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_0
c  in DIMACS:
-14261  14262 -14263 -408 -14264 0
-14261  14262 -14263 -408 -14265 0
-14261  14262 -14263 -408 -14266 0

c  0+1 --> 1
c    (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧  p_408) -> (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0)
c  in CNF:
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_2
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_1
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨  b^{24, 18}_0
c  in DIMACS:
 14261  14262  14263 -408 -14264 0
 14261  14262  14263 -408 -14265 0
 14261  14262  14263 -408  14266 0

c  1+1 --> 2
c    (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0 ∧  p_408) -> (-b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0)
c  in CNF:
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_2
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨  b^{24, 18}_1
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ -p_408 ∨ -b^{24, 18}_0
c  in DIMACS:
 14261  14262 -14263 -408 -14264 0
 14261  14262 -14263 -408  14265 0
 14261  14262 -14263 -408 -14266 0

c  2+1 --> break 
c    (-b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧  p_408) -> break
c  in CNF:
c     b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 14261 -14262  14263 -408 1162 0


c  2-1 --> 1
c    (-b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧ -p_408) -> (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0)
c  in CNF:
c     b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_2
c     b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_1
c     b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨  b^{24, 18}_0
c  in DIMACS:
 14261 -14262  14263  408 -14264 0
 14261 -14262  14263  408 -14265 0
 14261 -14262  14263  408  14266 0

c  1-1 --> 0
c    (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0 ∧ -p_408) -> (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧ -b^{24, 18}_0)
c  in CNF:
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_2
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_1
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_0
c  in DIMACS:
 14261  14262 -14263  408 -14264 0
 14261  14262 -14263  408 -14265 0
 14261  14262 -14263  408 -14266 0

c  0-1 --> -1
c    (-b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧ -p_408) -> ( b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0)
c  in CNF:
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨  b^{24, 18}_2
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_1
c     b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨  b^{24, 18}_0
c  in DIMACS:
 14261  14262  14263  408  14264 0
 14261  14262  14263  408 -14265 0
 14261  14262  14263  408  14266 0

c  -1-1 --> -2
c    ( b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧  b^{24, 17}_0 ∧ -p_408) -> ( b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0)
c  in CNF:
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨  b^{24, 18}_2
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨  b^{24, 18}_1
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨  p_408 ∨ -b^{24, 18}_0
c  in DIMACS:
-14261  14262 -14263  408  14264 0
-14261  14262 -14263  408  14265 0
-14261  14262 -14263  408 -14266 0

c  -2-1 --> break 
c    ( b^{24, 17}_2 ∧  b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨  b^{24, 17}_0 ∨  p_408 ∨ break
c  in DIMACS:
-14261 -14262  14263  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 17}_2 ∧ -b^{24, 17}_1 ∧ -b^{24, 17}_0 ∧ true) 
c  in CNF:
c    -b^{24, 17}_2 ∨  b^{24, 17}_1 ∨  b^{24, 17}_0 ∨ false 
c  in DIMACS:
-14261  14262  14263  0

c  3 does not represent an automaton state.
c    -(-b^{24, 17}_2 ∧  b^{24, 17}_1 ∧  b^{24, 17}_0 ∧ true) 
c  in CNF:
c     b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ false 
c  in DIMACS:
 14261 -14262 -14263  0
c  -3 does not represent an automaton state.
c    -( b^{24, 17}_2 ∧  b^{24, 17}_1 ∧  b^{24, 17}_0 ∧ true) 
c  in CNF:
c    -b^{24, 17}_2 ∨ -b^{24, 17}_1 ∨ -b^{24, 17}_0 ∨ false 
c  in DIMACS:
-14261 -14262 -14263  0

c i = 18
c  -2+1 --> -1
c    ( b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧  p_432) -> ( b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0)
c  in CNF:
c    -b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨  b^{24, 19}_2
c    -b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_1
c    -b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨  b^{24, 19}_0
c  in DIMACS:
-14264 -14265  14266 -432  14267 0
-14264 -14265  14266 -432 -14268 0
-14264 -14265  14266 -432  14269 0

c  -1+1 --> 0
c    ( b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0 ∧  p_432) -> (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧ -b^{24, 19}_0)
c  in CNF:
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_2
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_1
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_0
c  in DIMACS:
-14264  14265 -14266 -432 -14267 0
-14264  14265 -14266 -432 -14268 0
-14264  14265 -14266 -432 -14269 0

c  0+1 --> 1
c    (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧  p_432) -> (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0)
c  in CNF:
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_2
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_1
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨  b^{24, 19}_0
c  in DIMACS:
 14264  14265  14266 -432 -14267 0
 14264  14265  14266 -432 -14268 0
 14264  14265  14266 -432  14269 0

c  1+1 --> 2
c    (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0 ∧  p_432) -> (-b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0)
c  in CNF:
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_2
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨  b^{24, 19}_1
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ -p_432 ∨ -b^{24, 19}_0
c  in DIMACS:
 14264  14265 -14266 -432 -14267 0
 14264  14265 -14266 -432  14268 0
 14264  14265 -14266 -432 -14269 0

c  2+1 --> break 
c    (-b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧  p_432) -> break
c  in CNF:
c     b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 14264 -14265  14266 -432 1162 0


c  2-1 --> 1
c    (-b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧ -p_432) -> (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0)
c  in CNF:
c     b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_2
c     b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_1
c     b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨  b^{24, 19}_0
c  in DIMACS:
 14264 -14265  14266  432 -14267 0
 14264 -14265  14266  432 -14268 0
 14264 -14265  14266  432  14269 0

c  1-1 --> 0
c    (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0 ∧ -p_432) -> (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧ -b^{24, 19}_0)
c  in CNF:
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_2
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_1
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_0
c  in DIMACS:
 14264  14265 -14266  432 -14267 0
 14264  14265 -14266  432 -14268 0
 14264  14265 -14266  432 -14269 0

c  0-1 --> -1
c    (-b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧ -p_432) -> ( b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0)
c  in CNF:
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨  b^{24, 19}_2
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_1
c     b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨  b^{24, 19}_0
c  in DIMACS:
 14264  14265  14266  432  14267 0
 14264  14265  14266  432 -14268 0
 14264  14265  14266  432  14269 0

c  -1-1 --> -2
c    ( b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧  b^{24, 18}_0 ∧ -p_432) -> ( b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0)
c  in CNF:
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨  b^{24, 19}_2
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨  b^{24, 19}_1
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨  p_432 ∨ -b^{24, 19}_0
c  in DIMACS:
-14264  14265 -14266  432  14267 0
-14264  14265 -14266  432  14268 0
-14264  14265 -14266  432 -14269 0

c  -2-1 --> break 
c    ( b^{24, 18}_2 ∧  b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨  b^{24, 18}_0 ∨  p_432 ∨ break
c  in DIMACS:
-14264 -14265  14266  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 18}_2 ∧ -b^{24, 18}_1 ∧ -b^{24, 18}_0 ∧ true) 
c  in CNF:
c    -b^{24, 18}_2 ∨  b^{24, 18}_1 ∨  b^{24, 18}_0 ∨ false 
c  in DIMACS:
-14264  14265  14266  0

c  3 does not represent an automaton state.
c    -(-b^{24, 18}_2 ∧  b^{24, 18}_1 ∧  b^{24, 18}_0 ∧ true) 
c  in CNF:
c     b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ false 
c  in DIMACS:
 14264 -14265 -14266  0
c  -3 does not represent an automaton state.
c    -( b^{24, 18}_2 ∧  b^{24, 18}_1 ∧  b^{24, 18}_0 ∧ true) 
c  in CNF:
c    -b^{24, 18}_2 ∨ -b^{24, 18}_1 ∨ -b^{24, 18}_0 ∨ false 
c  in DIMACS:
-14264 -14265 -14266  0

c i = 19
c  -2+1 --> -1
c    ( b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧  p_456) -> ( b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0)
c  in CNF:
c    -b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨  b^{24, 20}_2
c    -b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_1
c    -b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨  b^{24, 20}_0
c  in DIMACS:
-14267 -14268  14269 -456  14270 0
-14267 -14268  14269 -456 -14271 0
-14267 -14268  14269 -456  14272 0

c  -1+1 --> 0
c    ( b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0 ∧  p_456) -> (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧ -b^{24, 20}_0)
c  in CNF:
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_2
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_1
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_0
c  in DIMACS:
-14267  14268 -14269 -456 -14270 0
-14267  14268 -14269 -456 -14271 0
-14267  14268 -14269 -456 -14272 0

c  0+1 --> 1
c    (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧  p_456) -> (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0)
c  in CNF:
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_2
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_1
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨  b^{24, 20}_0
c  in DIMACS:
 14267  14268  14269 -456 -14270 0
 14267  14268  14269 -456 -14271 0
 14267  14268  14269 -456  14272 0

c  1+1 --> 2
c    (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0 ∧  p_456) -> (-b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0)
c  in CNF:
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_2
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨  b^{24, 20}_1
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ -p_456 ∨ -b^{24, 20}_0
c  in DIMACS:
 14267  14268 -14269 -456 -14270 0
 14267  14268 -14269 -456  14271 0
 14267  14268 -14269 -456 -14272 0

c  2+1 --> break 
c    (-b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧  p_456) -> break
c  in CNF:
c     b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 14267 -14268  14269 -456 1162 0


c  2-1 --> 1
c    (-b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧ -p_456) -> (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0)
c  in CNF:
c     b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_2
c     b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_1
c     b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨  b^{24, 20}_0
c  in DIMACS:
 14267 -14268  14269  456 -14270 0
 14267 -14268  14269  456 -14271 0
 14267 -14268  14269  456  14272 0

c  1-1 --> 0
c    (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0 ∧ -p_456) -> (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧ -b^{24, 20}_0)
c  in CNF:
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_2
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_1
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_0
c  in DIMACS:
 14267  14268 -14269  456 -14270 0
 14267  14268 -14269  456 -14271 0
 14267  14268 -14269  456 -14272 0

c  0-1 --> -1
c    (-b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧ -p_456) -> ( b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0)
c  in CNF:
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨  b^{24, 20}_2
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_1
c     b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨  b^{24, 20}_0
c  in DIMACS:
 14267  14268  14269  456  14270 0
 14267  14268  14269  456 -14271 0
 14267  14268  14269  456  14272 0

c  -1-1 --> -2
c    ( b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧  b^{24, 19}_0 ∧ -p_456) -> ( b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0)
c  in CNF:
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨  b^{24, 20}_2
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨  b^{24, 20}_1
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨  p_456 ∨ -b^{24, 20}_0
c  in DIMACS:
-14267  14268 -14269  456  14270 0
-14267  14268 -14269  456  14271 0
-14267  14268 -14269  456 -14272 0

c  -2-1 --> break 
c    ( b^{24, 19}_2 ∧  b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨  b^{24, 19}_0 ∨  p_456 ∨ break
c  in DIMACS:
-14267 -14268  14269  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 19}_2 ∧ -b^{24, 19}_1 ∧ -b^{24, 19}_0 ∧ true) 
c  in CNF:
c    -b^{24, 19}_2 ∨  b^{24, 19}_1 ∨  b^{24, 19}_0 ∨ false 
c  in DIMACS:
-14267  14268  14269  0

c  3 does not represent an automaton state.
c    -(-b^{24, 19}_2 ∧  b^{24, 19}_1 ∧  b^{24, 19}_0 ∧ true) 
c  in CNF:
c     b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ false 
c  in DIMACS:
 14267 -14268 -14269  0
c  -3 does not represent an automaton state.
c    -( b^{24, 19}_2 ∧  b^{24, 19}_1 ∧  b^{24, 19}_0 ∧ true) 
c  in CNF:
c    -b^{24, 19}_2 ∨ -b^{24, 19}_1 ∨ -b^{24, 19}_0 ∨ false 
c  in DIMACS:
-14267 -14268 -14269  0

c i = 20
c  -2+1 --> -1
c    ( b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧  p_480) -> ( b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0)
c  in CNF:
c    -b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨  b^{24, 21}_2
c    -b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_1
c    -b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨  b^{24, 21}_0
c  in DIMACS:
-14270 -14271  14272 -480  14273 0
-14270 -14271  14272 -480 -14274 0
-14270 -14271  14272 -480  14275 0

c  -1+1 --> 0
c    ( b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0 ∧  p_480) -> (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧ -b^{24, 21}_0)
c  in CNF:
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_2
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_1
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_0
c  in DIMACS:
-14270  14271 -14272 -480 -14273 0
-14270  14271 -14272 -480 -14274 0
-14270  14271 -14272 -480 -14275 0

c  0+1 --> 1
c    (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧  p_480) -> (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0)
c  in CNF:
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_2
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_1
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨  b^{24, 21}_0
c  in DIMACS:
 14270  14271  14272 -480 -14273 0
 14270  14271  14272 -480 -14274 0
 14270  14271  14272 -480  14275 0

c  1+1 --> 2
c    (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0 ∧  p_480) -> (-b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0)
c  in CNF:
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_2
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨  b^{24, 21}_1
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ -p_480 ∨ -b^{24, 21}_0
c  in DIMACS:
 14270  14271 -14272 -480 -14273 0
 14270  14271 -14272 -480  14274 0
 14270  14271 -14272 -480 -14275 0

c  2+1 --> break 
c    (-b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧  p_480) -> break
c  in CNF:
c     b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 14270 -14271  14272 -480 1162 0


c  2-1 --> 1
c    (-b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧ -p_480) -> (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0)
c  in CNF:
c     b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_2
c     b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_1
c     b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨  b^{24, 21}_0
c  in DIMACS:
 14270 -14271  14272  480 -14273 0
 14270 -14271  14272  480 -14274 0
 14270 -14271  14272  480  14275 0

c  1-1 --> 0
c    (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0 ∧ -p_480) -> (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧ -b^{24, 21}_0)
c  in CNF:
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_2
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_1
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_0
c  in DIMACS:
 14270  14271 -14272  480 -14273 0
 14270  14271 -14272  480 -14274 0
 14270  14271 -14272  480 -14275 0

c  0-1 --> -1
c    (-b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧ -p_480) -> ( b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0)
c  in CNF:
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨  b^{24, 21}_2
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_1
c     b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨  b^{24, 21}_0
c  in DIMACS:
 14270  14271  14272  480  14273 0
 14270  14271  14272  480 -14274 0
 14270  14271  14272  480  14275 0

c  -1-1 --> -2
c    ( b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧  b^{24, 20}_0 ∧ -p_480) -> ( b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0)
c  in CNF:
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨  b^{24, 21}_2
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨  b^{24, 21}_1
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨  p_480 ∨ -b^{24, 21}_0
c  in DIMACS:
-14270  14271 -14272  480  14273 0
-14270  14271 -14272  480  14274 0
-14270  14271 -14272  480 -14275 0

c  -2-1 --> break 
c    ( b^{24, 20}_2 ∧  b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨  b^{24, 20}_0 ∨  p_480 ∨ break
c  in DIMACS:
-14270 -14271  14272  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 20}_2 ∧ -b^{24, 20}_1 ∧ -b^{24, 20}_0 ∧ true) 
c  in CNF:
c    -b^{24, 20}_2 ∨  b^{24, 20}_1 ∨  b^{24, 20}_0 ∨ false 
c  in DIMACS:
-14270  14271  14272  0

c  3 does not represent an automaton state.
c    -(-b^{24, 20}_2 ∧  b^{24, 20}_1 ∧  b^{24, 20}_0 ∧ true) 
c  in CNF:
c     b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ false 
c  in DIMACS:
 14270 -14271 -14272  0
c  -3 does not represent an automaton state.
c    -( b^{24, 20}_2 ∧  b^{24, 20}_1 ∧  b^{24, 20}_0 ∧ true) 
c  in CNF:
c    -b^{24, 20}_2 ∨ -b^{24, 20}_1 ∨ -b^{24, 20}_0 ∨ false 
c  in DIMACS:
-14270 -14271 -14272  0

c i = 21
c  -2+1 --> -1
c    ( b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧  p_504) -> ( b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0)
c  in CNF:
c    -b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨  b^{24, 22}_2
c    -b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_1
c    -b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨  b^{24, 22}_0
c  in DIMACS:
-14273 -14274  14275 -504  14276 0
-14273 -14274  14275 -504 -14277 0
-14273 -14274  14275 -504  14278 0

c  -1+1 --> 0
c    ( b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0 ∧  p_504) -> (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧ -b^{24, 22}_0)
c  in CNF:
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_2
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_1
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_0
c  in DIMACS:
-14273  14274 -14275 -504 -14276 0
-14273  14274 -14275 -504 -14277 0
-14273  14274 -14275 -504 -14278 0

c  0+1 --> 1
c    (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧  p_504) -> (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0)
c  in CNF:
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_2
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_1
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨  b^{24, 22}_0
c  in DIMACS:
 14273  14274  14275 -504 -14276 0
 14273  14274  14275 -504 -14277 0
 14273  14274  14275 -504  14278 0

c  1+1 --> 2
c    (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0 ∧  p_504) -> (-b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0)
c  in CNF:
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_2
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨  b^{24, 22}_1
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ -p_504 ∨ -b^{24, 22}_0
c  in DIMACS:
 14273  14274 -14275 -504 -14276 0
 14273  14274 -14275 -504  14277 0
 14273  14274 -14275 -504 -14278 0

c  2+1 --> break 
c    (-b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧  p_504) -> break
c  in CNF:
c     b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 14273 -14274  14275 -504 1162 0


c  2-1 --> 1
c    (-b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧ -p_504) -> (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0)
c  in CNF:
c     b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_2
c     b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_1
c     b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨  b^{24, 22}_0
c  in DIMACS:
 14273 -14274  14275  504 -14276 0
 14273 -14274  14275  504 -14277 0
 14273 -14274  14275  504  14278 0

c  1-1 --> 0
c    (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0 ∧ -p_504) -> (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧ -b^{24, 22}_0)
c  in CNF:
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_2
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_1
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_0
c  in DIMACS:
 14273  14274 -14275  504 -14276 0
 14273  14274 -14275  504 -14277 0
 14273  14274 -14275  504 -14278 0

c  0-1 --> -1
c    (-b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧ -p_504) -> ( b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0)
c  in CNF:
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨  b^{24, 22}_2
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_1
c     b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨  b^{24, 22}_0
c  in DIMACS:
 14273  14274  14275  504  14276 0
 14273  14274  14275  504 -14277 0
 14273  14274  14275  504  14278 0

c  -1-1 --> -2
c    ( b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧  b^{24, 21}_0 ∧ -p_504) -> ( b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0)
c  in CNF:
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨  b^{24, 22}_2
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨  b^{24, 22}_1
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨  p_504 ∨ -b^{24, 22}_0
c  in DIMACS:
-14273  14274 -14275  504  14276 0
-14273  14274 -14275  504  14277 0
-14273  14274 -14275  504 -14278 0

c  -2-1 --> break 
c    ( b^{24, 21}_2 ∧  b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨  b^{24, 21}_0 ∨  p_504 ∨ break
c  in DIMACS:
-14273 -14274  14275  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 21}_2 ∧ -b^{24, 21}_1 ∧ -b^{24, 21}_0 ∧ true) 
c  in CNF:
c    -b^{24, 21}_2 ∨  b^{24, 21}_1 ∨  b^{24, 21}_0 ∨ false 
c  in DIMACS:
-14273  14274  14275  0

c  3 does not represent an automaton state.
c    -(-b^{24, 21}_2 ∧  b^{24, 21}_1 ∧  b^{24, 21}_0 ∧ true) 
c  in CNF:
c     b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ false 
c  in DIMACS:
 14273 -14274 -14275  0
c  -3 does not represent an automaton state.
c    -( b^{24, 21}_2 ∧  b^{24, 21}_1 ∧  b^{24, 21}_0 ∧ true) 
c  in CNF:
c    -b^{24, 21}_2 ∨ -b^{24, 21}_1 ∨ -b^{24, 21}_0 ∨ false 
c  in DIMACS:
-14273 -14274 -14275  0

c i = 22
c  -2+1 --> -1
c    ( b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧  p_528) -> ( b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0)
c  in CNF:
c    -b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨  b^{24, 23}_2
c    -b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_1
c    -b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨  b^{24, 23}_0
c  in DIMACS:
-14276 -14277  14278 -528  14279 0
-14276 -14277  14278 -528 -14280 0
-14276 -14277  14278 -528  14281 0

c  -1+1 --> 0
c    ( b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0 ∧  p_528) -> (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧ -b^{24, 23}_0)
c  in CNF:
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_2
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_1
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_0
c  in DIMACS:
-14276  14277 -14278 -528 -14279 0
-14276  14277 -14278 -528 -14280 0
-14276  14277 -14278 -528 -14281 0

c  0+1 --> 1
c    (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧  p_528) -> (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0)
c  in CNF:
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_2
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_1
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨  b^{24, 23}_0
c  in DIMACS:
 14276  14277  14278 -528 -14279 0
 14276  14277  14278 -528 -14280 0
 14276  14277  14278 -528  14281 0

c  1+1 --> 2
c    (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0 ∧  p_528) -> (-b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0)
c  in CNF:
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_2
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨  b^{24, 23}_1
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ -p_528 ∨ -b^{24, 23}_0
c  in DIMACS:
 14276  14277 -14278 -528 -14279 0
 14276  14277 -14278 -528  14280 0
 14276  14277 -14278 -528 -14281 0

c  2+1 --> break 
c    (-b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧  p_528) -> break
c  in CNF:
c     b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 14276 -14277  14278 -528 1162 0


c  2-1 --> 1
c    (-b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧ -p_528) -> (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0)
c  in CNF:
c     b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_2
c     b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_1
c     b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨  b^{24, 23}_0
c  in DIMACS:
 14276 -14277  14278  528 -14279 0
 14276 -14277  14278  528 -14280 0
 14276 -14277  14278  528  14281 0

c  1-1 --> 0
c    (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0 ∧ -p_528) -> (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧ -b^{24, 23}_0)
c  in CNF:
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_2
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_1
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_0
c  in DIMACS:
 14276  14277 -14278  528 -14279 0
 14276  14277 -14278  528 -14280 0
 14276  14277 -14278  528 -14281 0

c  0-1 --> -1
c    (-b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧ -p_528) -> ( b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0)
c  in CNF:
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨  b^{24, 23}_2
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_1
c     b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨  b^{24, 23}_0
c  in DIMACS:
 14276  14277  14278  528  14279 0
 14276  14277  14278  528 -14280 0
 14276  14277  14278  528  14281 0

c  -1-1 --> -2
c    ( b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧  b^{24, 22}_0 ∧ -p_528) -> ( b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0)
c  in CNF:
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨  b^{24, 23}_2
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨  b^{24, 23}_1
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨  p_528 ∨ -b^{24, 23}_0
c  in DIMACS:
-14276  14277 -14278  528  14279 0
-14276  14277 -14278  528  14280 0
-14276  14277 -14278  528 -14281 0

c  -2-1 --> break 
c    ( b^{24, 22}_2 ∧  b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨  b^{24, 22}_0 ∨  p_528 ∨ break
c  in DIMACS:
-14276 -14277  14278  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 22}_2 ∧ -b^{24, 22}_1 ∧ -b^{24, 22}_0 ∧ true) 
c  in CNF:
c    -b^{24, 22}_2 ∨  b^{24, 22}_1 ∨  b^{24, 22}_0 ∨ false 
c  in DIMACS:
-14276  14277  14278  0

c  3 does not represent an automaton state.
c    -(-b^{24, 22}_2 ∧  b^{24, 22}_1 ∧  b^{24, 22}_0 ∧ true) 
c  in CNF:
c     b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ false 
c  in DIMACS:
 14276 -14277 -14278  0
c  -3 does not represent an automaton state.
c    -( b^{24, 22}_2 ∧  b^{24, 22}_1 ∧  b^{24, 22}_0 ∧ true) 
c  in CNF:
c    -b^{24, 22}_2 ∨ -b^{24, 22}_1 ∨ -b^{24, 22}_0 ∨ false 
c  in DIMACS:
-14276 -14277 -14278  0

c i = 23
c  -2+1 --> -1
c    ( b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧  p_552) -> ( b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0)
c  in CNF:
c    -b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨  b^{24, 24}_2
c    -b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_1
c    -b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨  b^{24, 24}_0
c  in DIMACS:
-14279 -14280  14281 -552  14282 0
-14279 -14280  14281 -552 -14283 0
-14279 -14280  14281 -552  14284 0

c  -1+1 --> 0
c    ( b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0 ∧  p_552) -> (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧ -b^{24, 24}_0)
c  in CNF:
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_2
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_1
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_0
c  in DIMACS:
-14279  14280 -14281 -552 -14282 0
-14279  14280 -14281 -552 -14283 0
-14279  14280 -14281 -552 -14284 0

c  0+1 --> 1
c    (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧  p_552) -> (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0)
c  in CNF:
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_2
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_1
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨  b^{24, 24}_0
c  in DIMACS:
 14279  14280  14281 -552 -14282 0
 14279  14280  14281 -552 -14283 0
 14279  14280  14281 -552  14284 0

c  1+1 --> 2
c    (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0 ∧  p_552) -> (-b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0)
c  in CNF:
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_2
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨  b^{24, 24}_1
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ -p_552 ∨ -b^{24, 24}_0
c  in DIMACS:
 14279  14280 -14281 -552 -14282 0
 14279  14280 -14281 -552  14283 0
 14279  14280 -14281 -552 -14284 0

c  2+1 --> break 
c    (-b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧  p_552) -> break
c  in CNF:
c     b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 14279 -14280  14281 -552 1162 0


c  2-1 --> 1
c    (-b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧ -p_552) -> (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0)
c  in CNF:
c     b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_2
c     b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_1
c     b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨  b^{24, 24}_0
c  in DIMACS:
 14279 -14280  14281  552 -14282 0
 14279 -14280  14281  552 -14283 0
 14279 -14280  14281  552  14284 0

c  1-1 --> 0
c    (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0 ∧ -p_552) -> (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧ -b^{24, 24}_0)
c  in CNF:
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_2
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_1
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_0
c  in DIMACS:
 14279  14280 -14281  552 -14282 0
 14279  14280 -14281  552 -14283 0
 14279  14280 -14281  552 -14284 0

c  0-1 --> -1
c    (-b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧ -p_552) -> ( b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0)
c  in CNF:
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨  b^{24, 24}_2
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_1
c     b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨  b^{24, 24}_0
c  in DIMACS:
 14279  14280  14281  552  14282 0
 14279  14280  14281  552 -14283 0
 14279  14280  14281  552  14284 0

c  -1-1 --> -2
c    ( b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧  b^{24, 23}_0 ∧ -p_552) -> ( b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0)
c  in CNF:
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨  b^{24, 24}_2
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨  b^{24, 24}_1
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨  p_552 ∨ -b^{24, 24}_0
c  in DIMACS:
-14279  14280 -14281  552  14282 0
-14279  14280 -14281  552  14283 0
-14279  14280 -14281  552 -14284 0

c  -2-1 --> break 
c    ( b^{24, 23}_2 ∧  b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨  b^{24, 23}_0 ∨  p_552 ∨ break
c  in DIMACS:
-14279 -14280  14281  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 23}_2 ∧ -b^{24, 23}_1 ∧ -b^{24, 23}_0 ∧ true) 
c  in CNF:
c    -b^{24, 23}_2 ∨  b^{24, 23}_1 ∨  b^{24, 23}_0 ∨ false 
c  in DIMACS:
-14279  14280  14281  0

c  3 does not represent an automaton state.
c    -(-b^{24, 23}_2 ∧  b^{24, 23}_1 ∧  b^{24, 23}_0 ∧ true) 
c  in CNF:
c     b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ false 
c  in DIMACS:
 14279 -14280 -14281  0
c  -3 does not represent an automaton state.
c    -( b^{24, 23}_2 ∧  b^{24, 23}_1 ∧  b^{24, 23}_0 ∧ true) 
c  in CNF:
c    -b^{24, 23}_2 ∨ -b^{24, 23}_1 ∨ -b^{24, 23}_0 ∨ false 
c  in DIMACS:
-14279 -14280 -14281  0

c i = 24
c  -2+1 --> -1
c    ( b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧  p_576) -> ( b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0)
c  in CNF:
c    -b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨  b^{24, 25}_2
c    -b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_1
c    -b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨  b^{24, 25}_0
c  in DIMACS:
-14282 -14283  14284 -576  14285 0
-14282 -14283  14284 -576 -14286 0
-14282 -14283  14284 -576  14287 0

c  -1+1 --> 0
c    ( b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0 ∧  p_576) -> (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧ -b^{24, 25}_0)
c  in CNF:
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_2
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_1
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_0
c  in DIMACS:
-14282  14283 -14284 -576 -14285 0
-14282  14283 -14284 -576 -14286 0
-14282  14283 -14284 -576 -14287 0

c  0+1 --> 1
c    (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧  p_576) -> (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0)
c  in CNF:
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_2
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_1
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨  b^{24, 25}_0
c  in DIMACS:
 14282  14283  14284 -576 -14285 0
 14282  14283  14284 -576 -14286 0
 14282  14283  14284 -576  14287 0

c  1+1 --> 2
c    (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0 ∧  p_576) -> (-b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0)
c  in CNF:
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_2
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨  b^{24, 25}_1
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ -p_576 ∨ -b^{24, 25}_0
c  in DIMACS:
 14282  14283 -14284 -576 -14285 0
 14282  14283 -14284 -576  14286 0
 14282  14283 -14284 -576 -14287 0

c  2+1 --> break 
c    (-b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧  p_576) -> break
c  in CNF:
c     b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 14282 -14283  14284 -576 1162 0


c  2-1 --> 1
c    (-b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧ -p_576) -> (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0)
c  in CNF:
c     b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_2
c     b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_1
c     b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨  b^{24, 25}_0
c  in DIMACS:
 14282 -14283  14284  576 -14285 0
 14282 -14283  14284  576 -14286 0
 14282 -14283  14284  576  14287 0

c  1-1 --> 0
c    (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0 ∧ -p_576) -> (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧ -b^{24, 25}_0)
c  in CNF:
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_2
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_1
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_0
c  in DIMACS:
 14282  14283 -14284  576 -14285 0
 14282  14283 -14284  576 -14286 0
 14282  14283 -14284  576 -14287 0

c  0-1 --> -1
c    (-b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧ -p_576) -> ( b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0)
c  in CNF:
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨  b^{24, 25}_2
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_1
c     b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨  b^{24, 25}_0
c  in DIMACS:
 14282  14283  14284  576  14285 0
 14282  14283  14284  576 -14286 0
 14282  14283  14284  576  14287 0

c  -1-1 --> -2
c    ( b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧  b^{24, 24}_0 ∧ -p_576) -> ( b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0)
c  in CNF:
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨  b^{24, 25}_2
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨  b^{24, 25}_1
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨  p_576 ∨ -b^{24, 25}_0
c  in DIMACS:
-14282  14283 -14284  576  14285 0
-14282  14283 -14284  576  14286 0
-14282  14283 -14284  576 -14287 0

c  -2-1 --> break 
c    ( b^{24, 24}_2 ∧  b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨  b^{24, 24}_0 ∨  p_576 ∨ break
c  in DIMACS:
-14282 -14283  14284  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 24}_2 ∧ -b^{24, 24}_1 ∧ -b^{24, 24}_0 ∧ true) 
c  in CNF:
c    -b^{24, 24}_2 ∨  b^{24, 24}_1 ∨  b^{24, 24}_0 ∨ false 
c  in DIMACS:
-14282  14283  14284  0

c  3 does not represent an automaton state.
c    -(-b^{24, 24}_2 ∧  b^{24, 24}_1 ∧  b^{24, 24}_0 ∧ true) 
c  in CNF:
c     b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ false 
c  in DIMACS:
 14282 -14283 -14284  0
c  -3 does not represent an automaton state.
c    -( b^{24, 24}_2 ∧  b^{24, 24}_1 ∧  b^{24, 24}_0 ∧ true) 
c  in CNF:
c    -b^{24, 24}_2 ∨ -b^{24, 24}_1 ∨ -b^{24, 24}_0 ∨ false 
c  in DIMACS:
-14282 -14283 -14284  0

c i = 25
c  -2+1 --> -1
c    ( b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧  p_600) -> ( b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0)
c  in CNF:
c    -b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨  b^{24, 26}_2
c    -b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_1
c    -b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨  b^{24, 26}_0
c  in DIMACS:
-14285 -14286  14287 -600  14288 0
-14285 -14286  14287 -600 -14289 0
-14285 -14286  14287 -600  14290 0

c  -1+1 --> 0
c    ( b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0 ∧  p_600) -> (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧ -b^{24, 26}_0)
c  in CNF:
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_2
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_1
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_0
c  in DIMACS:
-14285  14286 -14287 -600 -14288 0
-14285  14286 -14287 -600 -14289 0
-14285  14286 -14287 -600 -14290 0

c  0+1 --> 1
c    (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧  p_600) -> (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0)
c  in CNF:
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_2
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_1
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨  b^{24, 26}_0
c  in DIMACS:
 14285  14286  14287 -600 -14288 0
 14285  14286  14287 -600 -14289 0
 14285  14286  14287 -600  14290 0

c  1+1 --> 2
c    (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0 ∧  p_600) -> (-b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0)
c  in CNF:
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_2
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨  b^{24, 26}_1
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ -p_600 ∨ -b^{24, 26}_0
c  in DIMACS:
 14285  14286 -14287 -600 -14288 0
 14285  14286 -14287 -600  14289 0
 14285  14286 -14287 -600 -14290 0

c  2+1 --> break 
c    (-b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧  p_600) -> break
c  in CNF:
c     b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 14285 -14286  14287 -600 1162 0


c  2-1 --> 1
c    (-b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧ -p_600) -> (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0)
c  in CNF:
c     b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_2
c     b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_1
c     b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨  b^{24, 26}_0
c  in DIMACS:
 14285 -14286  14287  600 -14288 0
 14285 -14286  14287  600 -14289 0
 14285 -14286  14287  600  14290 0

c  1-1 --> 0
c    (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0 ∧ -p_600) -> (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧ -b^{24, 26}_0)
c  in CNF:
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_2
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_1
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_0
c  in DIMACS:
 14285  14286 -14287  600 -14288 0
 14285  14286 -14287  600 -14289 0
 14285  14286 -14287  600 -14290 0

c  0-1 --> -1
c    (-b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧ -p_600) -> ( b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0)
c  in CNF:
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨  b^{24, 26}_2
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_1
c     b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨  b^{24, 26}_0
c  in DIMACS:
 14285  14286  14287  600  14288 0
 14285  14286  14287  600 -14289 0
 14285  14286  14287  600  14290 0

c  -1-1 --> -2
c    ( b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧  b^{24, 25}_0 ∧ -p_600) -> ( b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0)
c  in CNF:
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨  b^{24, 26}_2
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨  b^{24, 26}_1
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨  p_600 ∨ -b^{24, 26}_0
c  in DIMACS:
-14285  14286 -14287  600  14288 0
-14285  14286 -14287  600  14289 0
-14285  14286 -14287  600 -14290 0

c  -2-1 --> break 
c    ( b^{24, 25}_2 ∧  b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨  b^{24, 25}_0 ∨  p_600 ∨ break
c  in DIMACS:
-14285 -14286  14287  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 25}_2 ∧ -b^{24, 25}_1 ∧ -b^{24, 25}_0 ∧ true) 
c  in CNF:
c    -b^{24, 25}_2 ∨  b^{24, 25}_1 ∨  b^{24, 25}_0 ∨ false 
c  in DIMACS:
-14285  14286  14287  0

c  3 does not represent an automaton state.
c    -(-b^{24, 25}_2 ∧  b^{24, 25}_1 ∧  b^{24, 25}_0 ∧ true) 
c  in CNF:
c     b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ false 
c  in DIMACS:
 14285 -14286 -14287  0
c  -3 does not represent an automaton state.
c    -( b^{24, 25}_2 ∧  b^{24, 25}_1 ∧  b^{24, 25}_0 ∧ true) 
c  in CNF:
c    -b^{24, 25}_2 ∨ -b^{24, 25}_1 ∨ -b^{24, 25}_0 ∨ false 
c  in DIMACS:
-14285 -14286 -14287  0

c i = 26
c  -2+1 --> -1
c    ( b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧  p_624) -> ( b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0)
c  in CNF:
c    -b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨  b^{24, 27}_2
c    -b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_1
c    -b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨  b^{24, 27}_0
c  in DIMACS:
-14288 -14289  14290 -624  14291 0
-14288 -14289  14290 -624 -14292 0
-14288 -14289  14290 -624  14293 0

c  -1+1 --> 0
c    ( b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0 ∧  p_624) -> (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧ -b^{24, 27}_0)
c  in CNF:
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_2
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_1
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_0
c  in DIMACS:
-14288  14289 -14290 -624 -14291 0
-14288  14289 -14290 -624 -14292 0
-14288  14289 -14290 -624 -14293 0

c  0+1 --> 1
c    (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧  p_624) -> (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0)
c  in CNF:
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_2
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_1
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨  b^{24, 27}_0
c  in DIMACS:
 14288  14289  14290 -624 -14291 0
 14288  14289  14290 -624 -14292 0
 14288  14289  14290 -624  14293 0

c  1+1 --> 2
c    (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0 ∧  p_624) -> (-b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0)
c  in CNF:
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_2
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨  b^{24, 27}_1
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ -p_624 ∨ -b^{24, 27}_0
c  in DIMACS:
 14288  14289 -14290 -624 -14291 0
 14288  14289 -14290 -624  14292 0
 14288  14289 -14290 -624 -14293 0

c  2+1 --> break 
c    (-b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧  p_624) -> break
c  in CNF:
c     b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 14288 -14289  14290 -624 1162 0


c  2-1 --> 1
c    (-b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧ -p_624) -> (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0)
c  in CNF:
c     b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_2
c     b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_1
c     b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨  b^{24, 27}_0
c  in DIMACS:
 14288 -14289  14290  624 -14291 0
 14288 -14289  14290  624 -14292 0
 14288 -14289  14290  624  14293 0

c  1-1 --> 0
c    (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0 ∧ -p_624) -> (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧ -b^{24, 27}_0)
c  in CNF:
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_2
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_1
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_0
c  in DIMACS:
 14288  14289 -14290  624 -14291 0
 14288  14289 -14290  624 -14292 0
 14288  14289 -14290  624 -14293 0

c  0-1 --> -1
c    (-b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧ -p_624) -> ( b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0)
c  in CNF:
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨  b^{24, 27}_2
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_1
c     b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨  b^{24, 27}_0
c  in DIMACS:
 14288  14289  14290  624  14291 0
 14288  14289  14290  624 -14292 0
 14288  14289  14290  624  14293 0

c  -1-1 --> -2
c    ( b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧  b^{24, 26}_0 ∧ -p_624) -> ( b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0)
c  in CNF:
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨  b^{24, 27}_2
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨  b^{24, 27}_1
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨  p_624 ∨ -b^{24, 27}_0
c  in DIMACS:
-14288  14289 -14290  624  14291 0
-14288  14289 -14290  624  14292 0
-14288  14289 -14290  624 -14293 0

c  -2-1 --> break 
c    ( b^{24, 26}_2 ∧  b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨  b^{24, 26}_0 ∨  p_624 ∨ break
c  in DIMACS:
-14288 -14289  14290  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 26}_2 ∧ -b^{24, 26}_1 ∧ -b^{24, 26}_0 ∧ true) 
c  in CNF:
c    -b^{24, 26}_2 ∨  b^{24, 26}_1 ∨  b^{24, 26}_0 ∨ false 
c  in DIMACS:
-14288  14289  14290  0

c  3 does not represent an automaton state.
c    -(-b^{24, 26}_2 ∧  b^{24, 26}_1 ∧  b^{24, 26}_0 ∧ true) 
c  in CNF:
c     b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ false 
c  in DIMACS:
 14288 -14289 -14290  0
c  -3 does not represent an automaton state.
c    -( b^{24, 26}_2 ∧  b^{24, 26}_1 ∧  b^{24, 26}_0 ∧ true) 
c  in CNF:
c    -b^{24, 26}_2 ∨ -b^{24, 26}_1 ∨ -b^{24, 26}_0 ∨ false 
c  in DIMACS:
-14288 -14289 -14290  0

c i = 27
c  -2+1 --> -1
c    ( b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧  p_648) -> ( b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0)
c  in CNF:
c    -b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨  b^{24, 28}_2
c    -b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_1
c    -b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨  b^{24, 28}_0
c  in DIMACS:
-14291 -14292  14293 -648  14294 0
-14291 -14292  14293 -648 -14295 0
-14291 -14292  14293 -648  14296 0

c  -1+1 --> 0
c    ( b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0 ∧  p_648) -> (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧ -b^{24, 28}_0)
c  in CNF:
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_2
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_1
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_0
c  in DIMACS:
-14291  14292 -14293 -648 -14294 0
-14291  14292 -14293 -648 -14295 0
-14291  14292 -14293 -648 -14296 0

c  0+1 --> 1
c    (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧  p_648) -> (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0)
c  in CNF:
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_2
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_1
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨  b^{24, 28}_0
c  in DIMACS:
 14291  14292  14293 -648 -14294 0
 14291  14292  14293 -648 -14295 0
 14291  14292  14293 -648  14296 0

c  1+1 --> 2
c    (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0 ∧  p_648) -> (-b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0)
c  in CNF:
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_2
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨  b^{24, 28}_1
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ -p_648 ∨ -b^{24, 28}_0
c  in DIMACS:
 14291  14292 -14293 -648 -14294 0
 14291  14292 -14293 -648  14295 0
 14291  14292 -14293 -648 -14296 0

c  2+1 --> break 
c    (-b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧  p_648) -> break
c  in CNF:
c     b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 14291 -14292  14293 -648 1162 0


c  2-1 --> 1
c    (-b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧ -p_648) -> (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0)
c  in CNF:
c     b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_2
c     b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_1
c     b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨  b^{24, 28}_0
c  in DIMACS:
 14291 -14292  14293  648 -14294 0
 14291 -14292  14293  648 -14295 0
 14291 -14292  14293  648  14296 0

c  1-1 --> 0
c    (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0 ∧ -p_648) -> (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧ -b^{24, 28}_0)
c  in CNF:
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_2
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_1
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_0
c  in DIMACS:
 14291  14292 -14293  648 -14294 0
 14291  14292 -14293  648 -14295 0
 14291  14292 -14293  648 -14296 0

c  0-1 --> -1
c    (-b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧ -p_648) -> ( b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0)
c  in CNF:
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨  b^{24, 28}_2
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_1
c     b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨  b^{24, 28}_0
c  in DIMACS:
 14291  14292  14293  648  14294 0
 14291  14292  14293  648 -14295 0
 14291  14292  14293  648  14296 0

c  -1-1 --> -2
c    ( b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧  b^{24, 27}_0 ∧ -p_648) -> ( b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0)
c  in CNF:
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨  b^{24, 28}_2
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨  b^{24, 28}_1
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨  p_648 ∨ -b^{24, 28}_0
c  in DIMACS:
-14291  14292 -14293  648  14294 0
-14291  14292 -14293  648  14295 0
-14291  14292 -14293  648 -14296 0

c  -2-1 --> break 
c    ( b^{24, 27}_2 ∧  b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨  b^{24, 27}_0 ∨  p_648 ∨ break
c  in DIMACS:
-14291 -14292  14293  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 27}_2 ∧ -b^{24, 27}_1 ∧ -b^{24, 27}_0 ∧ true) 
c  in CNF:
c    -b^{24, 27}_2 ∨  b^{24, 27}_1 ∨  b^{24, 27}_0 ∨ false 
c  in DIMACS:
-14291  14292  14293  0

c  3 does not represent an automaton state.
c    -(-b^{24, 27}_2 ∧  b^{24, 27}_1 ∧  b^{24, 27}_0 ∧ true) 
c  in CNF:
c     b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ false 
c  in DIMACS:
 14291 -14292 -14293  0
c  -3 does not represent an automaton state.
c    -( b^{24, 27}_2 ∧  b^{24, 27}_1 ∧  b^{24, 27}_0 ∧ true) 
c  in CNF:
c    -b^{24, 27}_2 ∨ -b^{24, 27}_1 ∨ -b^{24, 27}_0 ∨ false 
c  in DIMACS:
-14291 -14292 -14293  0

c i = 28
c  -2+1 --> -1
c    ( b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧  p_672) -> ( b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0)
c  in CNF:
c    -b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨  b^{24, 29}_2
c    -b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_1
c    -b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨  b^{24, 29}_0
c  in DIMACS:
-14294 -14295  14296 -672  14297 0
-14294 -14295  14296 -672 -14298 0
-14294 -14295  14296 -672  14299 0

c  -1+1 --> 0
c    ( b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0 ∧  p_672) -> (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧ -b^{24, 29}_0)
c  in CNF:
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_2
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_1
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_0
c  in DIMACS:
-14294  14295 -14296 -672 -14297 0
-14294  14295 -14296 -672 -14298 0
-14294  14295 -14296 -672 -14299 0

c  0+1 --> 1
c    (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧  p_672) -> (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0)
c  in CNF:
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_2
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_1
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨  b^{24, 29}_0
c  in DIMACS:
 14294  14295  14296 -672 -14297 0
 14294  14295  14296 -672 -14298 0
 14294  14295  14296 -672  14299 0

c  1+1 --> 2
c    (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0 ∧  p_672) -> (-b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0)
c  in CNF:
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_2
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨  b^{24, 29}_1
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ -p_672 ∨ -b^{24, 29}_0
c  in DIMACS:
 14294  14295 -14296 -672 -14297 0
 14294  14295 -14296 -672  14298 0
 14294  14295 -14296 -672 -14299 0

c  2+1 --> break 
c    (-b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧  p_672) -> break
c  in CNF:
c     b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 14294 -14295  14296 -672 1162 0


c  2-1 --> 1
c    (-b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧ -p_672) -> (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0)
c  in CNF:
c     b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_2
c     b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_1
c     b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨  b^{24, 29}_0
c  in DIMACS:
 14294 -14295  14296  672 -14297 0
 14294 -14295  14296  672 -14298 0
 14294 -14295  14296  672  14299 0

c  1-1 --> 0
c    (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0 ∧ -p_672) -> (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧ -b^{24, 29}_0)
c  in CNF:
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_2
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_1
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_0
c  in DIMACS:
 14294  14295 -14296  672 -14297 0
 14294  14295 -14296  672 -14298 0
 14294  14295 -14296  672 -14299 0

c  0-1 --> -1
c    (-b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧ -p_672) -> ( b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0)
c  in CNF:
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨  b^{24, 29}_2
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_1
c     b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨  b^{24, 29}_0
c  in DIMACS:
 14294  14295  14296  672  14297 0
 14294  14295  14296  672 -14298 0
 14294  14295  14296  672  14299 0

c  -1-1 --> -2
c    ( b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧  b^{24, 28}_0 ∧ -p_672) -> ( b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0)
c  in CNF:
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨  b^{24, 29}_2
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨  b^{24, 29}_1
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨  p_672 ∨ -b^{24, 29}_0
c  in DIMACS:
-14294  14295 -14296  672  14297 0
-14294  14295 -14296  672  14298 0
-14294  14295 -14296  672 -14299 0

c  -2-1 --> break 
c    ( b^{24, 28}_2 ∧  b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨  b^{24, 28}_0 ∨  p_672 ∨ break
c  in DIMACS:
-14294 -14295  14296  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 28}_2 ∧ -b^{24, 28}_1 ∧ -b^{24, 28}_0 ∧ true) 
c  in CNF:
c    -b^{24, 28}_2 ∨  b^{24, 28}_1 ∨  b^{24, 28}_0 ∨ false 
c  in DIMACS:
-14294  14295  14296  0

c  3 does not represent an automaton state.
c    -(-b^{24, 28}_2 ∧  b^{24, 28}_1 ∧  b^{24, 28}_0 ∧ true) 
c  in CNF:
c     b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ false 
c  in DIMACS:
 14294 -14295 -14296  0
c  -3 does not represent an automaton state.
c    -( b^{24, 28}_2 ∧  b^{24, 28}_1 ∧  b^{24, 28}_0 ∧ true) 
c  in CNF:
c    -b^{24, 28}_2 ∨ -b^{24, 28}_1 ∨ -b^{24, 28}_0 ∨ false 
c  in DIMACS:
-14294 -14295 -14296  0

c i = 29
c  -2+1 --> -1
c    ( b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧  p_696) -> ( b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0)
c  in CNF:
c    -b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨  b^{24, 30}_2
c    -b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_1
c    -b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨  b^{24, 30}_0
c  in DIMACS:
-14297 -14298  14299 -696  14300 0
-14297 -14298  14299 -696 -14301 0
-14297 -14298  14299 -696  14302 0

c  -1+1 --> 0
c    ( b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0 ∧  p_696) -> (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧ -b^{24, 30}_0)
c  in CNF:
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_2
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_1
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_0
c  in DIMACS:
-14297  14298 -14299 -696 -14300 0
-14297  14298 -14299 -696 -14301 0
-14297  14298 -14299 -696 -14302 0

c  0+1 --> 1
c    (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧  p_696) -> (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0)
c  in CNF:
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_2
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_1
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨  b^{24, 30}_0
c  in DIMACS:
 14297  14298  14299 -696 -14300 0
 14297  14298  14299 -696 -14301 0
 14297  14298  14299 -696  14302 0

c  1+1 --> 2
c    (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0 ∧  p_696) -> (-b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0)
c  in CNF:
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_2
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨  b^{24, 30}_1
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ -p_696 ∨ -b^{24, 30}_0
c  in DIMACS:
 14297  14298 -14299 -696 -14300 0
 14297  14298 -14299 -696  14301 0
 14297  14298 -14299 -696 -14302 0

c  2+1 --> break 
c    (-b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧  p_696) -> break
c  in CNF:
c     b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 14297 -14298  14299 -696 1162 0


c  2-1 --> 1
c    (-b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧ -p_696) -> (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0)
c  in CNF:
c     b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_2
c     b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_1
c     b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨  b^{24, 30}_0
c  in DIMACS:
 14297 -14298  14299  696 -14300 0
 14297 -14298  14299  696 -14301 0
 14297 -14298  14299  696  14302 0

c  1-1 --> 0
c    (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0 ∧ -p_696) -> (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧ -b^{24, 30}_0)
c  in CNF:
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_2
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_1
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_0
c  in DIMACS:
 14297  14298 -14299  696 -14300 0
 14297  14298 -14299  696 -14301 0
 14297  14298 -14299  696 -14302 0

c  0-1 --> -1
c    (-b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧ -p_696) -> ( b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0)
c  in CNF:
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨  b^{24, 30}_2
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_1
c     b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨  b^{24, 30}_0
c  in DIMACS:
 14297  14298  14299  696  14300 0
 14297  14298  14299  696 -14301 0
 14297  14298  14299  696  14302 0

c  -1-1 --> -2
c    ( b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧  b^{24, 29}_0 ∧ -p_696) -> ( b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0)
c  in CNF:
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨  b^{24, 30}_2
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨  b^{24, 30}_1
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨  p_696 ∨ -b^{24, 30}_0
c  in DIMACS:
-14297  14298 -14299  696  14300 0
-14297  14298 -14299  696  14301 0
-14297  14298 -14299  696 -14302 0

c  -2-1 --> break 
c    ( b^{24, 29}_2 ∧  b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨  b^{24, 29}_0 ∨  p_696 ∨ break
c  in DIMACS:
-14297 -14298  14299  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 29}_2 ∧ -b^{24, 29}_1 ∧ -b^{24, 29}_0 ∧ true) 
c  in CNF:
c    -b^{24, 29}_2 ∨  b^{24, 29}_1 ∨  b^{24, 29}_0 ∨ false 
c  in DIMACS:
-14297  14298  14299  0

c  3 does not represent an automaton state.
c    -(-b^{24, 29}_2 ∧  b^{24, 29}_1 ∧  b^{24, 29}_0 ∧ true) 
c  in CNF:
c     b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ false 
c  in DIMACS:
 14297 -14298 -14299  0
c  -3 does not represent an automaton state.
c    -( b^{24, 29}_2 ∧  b^{24, 29}_1 ∧  b^{24, 29}_0 ∧ true) 
c  in CNF:
c    -b^{24, 29}_2 ∨ -b^{24, 29}_1 ∨ -b^{24, 29}_0 ∨ false 
c  in DIMACS:
-14297 -14298 -14299  0

c i = 30
c  -2+1 --> -1
c    ( b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧  p_720) -> ( b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0)
c  in CNF:
c    -b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨  b^{24, 31}_2
c    -b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_1
c    -b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨  b^{24, 31}_0
c  in DIMACS:
-14300 -14301  14302 -720  14303 0
-14300 -14301  14302 -720 -14304 0
-14300 -14301  14302 -720  14305 0

c  -1+1 --> 0
c    ( b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0 ∧  p_720) -> (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧ -b^{24, 31}_0)
c  in CNF:
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_2
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_1
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_0
c  in DIMACS:
-14300  14301 -14302 -720 -14303 0
-14300  14301 -14302 -720 -14304 0
-14300  14301 -14302 -720 -14305 0

c  0+1 --> 1
c    (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧  p_720) -> (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0)
c  in CNF:
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_2
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_1
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨  b^{24, 31}_0
c  in DIMACS:
 14300  14301  14302 -720 -14303 0
 14300  14301  14302 -720 -14304 0
 14300  14301  14302 -720  14305 0

c  1+1 --> 2
c    (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0 ∧  p_720) -> (-b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0)
c  in CNF:
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_2
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨  b^{24, 31}_1
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ -p_720 ∨ -b^{24, 31}_0
c  in DIMACS:
 14300  14301 -14302 -720 -14303 0
 14300  14301 -14302 -720  14304 0
 14300  14301 -14302 -720 -14305 0

c  2+1 --> break 
c    (-b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧  p_720) -> break
c  in CNF:
c     b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 14300 -14301  14302 -720 1162 0


c  2-1 --> 1
c    (-b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧ -p_720) -> (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0)
c  in CNF:
c     b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_2
c     b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_1
c     b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨  b^{24, 31}_0
c  in DIMACS:
 14300 -14301  14302  720 -14303 0
 14300 -14301  14302  720 -14304 0
 14300 -14301  14302  720  14305 0

c  1-1 --> 0
c    (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0 ∧ -p_720) -> (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧ -b^{24, 31}_0)
c  in CNF:
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_2
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_1
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_0
c  in DIMACS:
 14300  14301 -14302  720 -14303 0
 14300  14301 -14302  720 -14304 0
 14300  14301 -14302  720 -14305 0

c  0-1 --> -1
c    (-b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧ -p_720) -> ( b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0)
c  in CNF:
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨  b^{24, 31}_2
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_1
c     b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨  b^{24, 31}_0
c  in DIMACS:
 14300  14301  14302  720  14303 0
 14300  14301  14302  720 -14304 0
 14300  14301  14302  720  14305 0

c  -1-1 --> -2
c    ( b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧  b^{24, 30}_0 ∧ -p_720) -> ( b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0)
c  in CNF:
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨  b^{24, 31}_2
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨  b^{24, 31}_1
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨  p_720 ∨ -b^{24, 31}_0
c  in DIMACS:
-14300  14301 -14302  720  14303 0
-14300  14301 -14302  720  14304 0
-14300  14301 -14302  720 -14305 0

c  -2-1 --> break 
c    ( b^{24, 30}_2 ∧  b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨  b^{24, 30}_0 ∨  p_720 ∨ break
c  in DIMACS:
-14300 -14301  14302  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 30}_2 ∧ -b^{24, 30}_1 ∧ -b^{24, 30}_0 ∧ true) 
c  in CNF:
c    -b^{24, 30}_2 ∨  b^{24, 30}_1 ∨  b^{24, 30}_0 ∨ false 
c  in DIMACS:
-14300  14301  14302  0

c  3 does not represent an automaton state.
c    -(-b^{24, 30}_2 ∧  b^{24, 30}_1 ∧  b^{24, 30}_0 ∧ true) 
c  in CNF:
c     b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ false 
c  in DIMACS:
 14300 -14301 -14302  0
c  -3 does not represent an automaton state.
c    -( b^{24, 30}_2 ∧  b^{24, 30}_1 ∧  b^{24, 30}_0 ∧ true) 
c  in CNF:
c    -b^{24, 30}_2 ∨ -b^{24, 30}_1 ∨ -b^{24, 30}_0 ∨ false 
c  in DIMACS:
-14300 -14301 -14302  0

c i = 31
c  -2+1 --> -1
c    ( b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧  p_744) -> ( b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0)
c  in CNF:
c    -b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨  b^{24, 32}_2
c    -b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_1
c    -b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨  b^{24, 32}_0
c  in DIMACS:
-14303 -14304  14305 -744  14306 0
-14303 -14304  14305 -744 -14307 0
-14303 -14304  14305 -744  14308 0

c  -1+1 --> 0
c    ( b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0 ∧  p_744) -> (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧ -b^{24, 32}_0)
c  in CNF:
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_2
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_1
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_0
c  in DIMACS:
-14303  14304 -14305 -744 -14306 0
-14303  14304 -14305 -744 -14307 0
-14303  14304 -14305 -744 -14308 0

c  0+1 --> 1
c    (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧  p_744) -> (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0)
c  in CNF:
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_2
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_1
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨  b^{24, 32}_0
c  in DIMACS:
 14303  14304  14305 -744 -14306 0
 14303  14304  14305 -744 -14307 0
 14303  14304  14305 -744  14308 0

c  1+1 --> 2
c    (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0 ∧  p_744) -> (-b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0)
c  in CNF:
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_2
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨  b^{24, 32}_1
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ -p_744 ∨ -b^{24, 32}_0
c  in DIMACS:
 14303  14304 -14305 -744 -14306 0
 14303  14304 -14305 -744  14307 0
 14303  14304 -14305 -744 -14308 0

c  2+1 --> break 
c    (-b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧  p_744) -> break
c  in CNF:
c     b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 14303 -14304  14305 -744 1162 0


c  2-1 --> 1
c    (-b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧ -p_744) -> (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0)
c  in CNF:
c     b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_2
c     b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_1
c     b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨  b^{24, 32}_0
c  in DIMACS:
 14303 -14304  14305  744 -14306 0
 14303 -14304  14305  744 -14307 0
 14303 -14304  14305  744  14308 0

c  1-1 --> 0
c    (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0 ∧ -p_744) -> (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧ -b^{24, 32}_0)
c  in CNF:
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_2
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_1
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_0
c  in DIMACS:
 14303  14304 -14305  744 -14306 0
 14303  14304 -14305  744 -14307 0
 14303  14304 -14305  744 -14308 0

c  0-1 --> -1
c    (-b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧ -p_744) -> ( b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0)
c  in CNF:
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨  b^{24, 32}_2
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_1
c     b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨  b^{24, 32}_0
c  in DIMACS:
 14303  14304  14305  744  14306 0
 14303  14304  14305  744 -14307 0
 14303  14304  14305  744  14308 0

c  -1-1 --> -2
c    ( b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧  b^{24, 31}_0 ∧ -p_744) -> ( b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0)
c  in CNF:
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨  b^{24, 32}_2
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨  b^{24, 32}_1
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨  p_744 ∨ -b^{24, 32}_0
c  in DIMACS:
-14303  14304 -14305  744  14306 0
-14303  14304 -14305  744  14307 0
-14303  14304 -14305  744 -14308 0

c  -2-1 --> break 
c    ( b^{24, 31}_2 ∧  b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨  b^{24, 31}_0 ∨  p_744 ∨ break
c  in DIMACS:
-14303 -14304  14305  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 31}_2 ∧ -b^{24, 31}_1 ∧ -b^{24, 31}_0 ∧ true) 
c  in CNF:
c    -b^{24, 31}_2 ∨  b^{24, 31}_1 ∨  b^{24, 31}_0 ∨ false 
c  in DIMACS:
-14303  14304  14305  0

c  3 does not represent an automaton state.
c    -(-b^{24, 31}_2 ∧  b^{24, 31}_1 ∧  b^{24, 31}_0 ∧ true) 
c  in CNF:
c     b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ false 
c  in DIMACS:
 14303 -14304 -14305  0
c  -3 does not represent an automaton state.
c    -( b^{24, 31}_2 ∧  b^{24, 31}_1 ∧  b^{24, 31}_0 ∧ true) 
c  in CNF:
c    -b^{24, 31}_2 ∨ -b^{24, 31}_1 ∨ -b^{24, 31}_0 ∨ false 
c  in DIMACS:
-14303 -14304 -14305  0

c i = 32
c  -2+1 --> -1
c    ( b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧  p_768) -> ( b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0)
c  in CNF:
c    -b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨  b^{24, 33}_2
c    -b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_1
c    -b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨  b^{24, 33}_0
c  in DIMACS:
-14306 -14307  14308 -768  14309 0
-14306 -14307  14308 -768 -14310 0
-14306 -14307  14308 -768  14311 0

c  -1+1 --> 0
c    ( b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0 ∧  p_768) -> (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧ -b^{24, 33}_0)
c  in CNF:
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_2
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_1
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_0
c  in DIMACS:
-14306  14307 -14308 -768 -14309 0
-14306  14307 -14308 -768 -14310 0
-14306  14307 -14308 -768 -14311 0

c  0+1 --> 1
c    (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧  p_768) -> (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0)
c  in CNF:
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_2
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_1
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨  b^{24, 33}_0
c  in DIMACS:
 14306  14307  14308 -768 -14309 0
 14306  14307  14308 -768 -14310 0
 14306  14307  14308 -768  14311 0

c  1+1 --> 2
c    (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0 ∧  p_768) -> (-b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0)
c  in CNF:
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_2
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨  b^{24, 33}_1
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ -p_768 ∨ -b^{24, 33}_0
c  in DIMACS:
 14306  14307 -14308 -768 -14309 0
 14306  14307 -14308 -768  14310 0
 14306  14307 -14308 -768 -14311 0

c  2+1 --> break 
c    (-b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧  p_768) -> break
c  in CNF:
c     b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 14306 -14307  14308 -768 1162 0


c  2-1 --> 1
c    (-b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧ -p_768) -> (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0)
c  in CNF:
c     b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_2
c     b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_1
c     b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨  b^{24, 33}_0
c  in DIMACS:
 14306 -14307  14308  768 -14309 0
 14306 -14307  14308  768 -14310 0
 14306 -14307  14308  768  14311 0

c  1-1 --> 0
c    (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0 ∧ -p_768) -> (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧ -b^{24, 33}_0)
c  in CNF:
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_2
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_1
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_0
c  in DIMACS:
 14306  14307 -14308  768 -14309 0
 14306  14307 -14308  768 -14310 0
 14306  14307 -14308  768 -14311 0

c  0-1 --> -1
c    (-b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧ -p_768) -> ( b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0)
c  in CNF:
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨  b^{24, 33}_2
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_1
c     b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨  b^{24, 33}_0
c  in DIMACS:
 14306  14307  14308  768  14309 0
 14306  14307  14308  768 -14310 0
 14306  14307  14308  768  14311 0

c  -1-1 --> -2
c    ( b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧  b^{24, 32}_0 ∧ -p_768) -> ( b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0)
c  in CNF:
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨  b^{24, 33}_2
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨  b^{24, 33}_1
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨  p_768 ∨ -b^{24, 33}_0
c  in DIMACS:
-14306  14307 -14308  768  14309 0
-14306  14307 -14308  768  14310 0
-14306  14307 -14308  768 -14311 0

c  -2-1 --> break 
c    ( b^{24, 32}_2 ∧  b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨  b^{24, 32}_0 ∨  p_768 ∨ break
c  in DIMACS:
-14306 -14307  14308  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 32}_2 ∧ -b^{24, 32}_1 ∧ -b^{24, 32}_0 ∧ true) 
c  in CNF:
c    -b^{24, 32}_2 ∨  b^{24, 32}_1 ∨  b^{24, 32}_0 ∨ false 
c  in DIMACS:
-14306  14307  14308  0

c  3 does not represent an automaton state.
c    -(-b^{24, 32}_2 ∧  b^{24, 32}_1 ∧  b^{24, 32}_0 ∧ true) 
c  in CNF:
c     b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ false 
c  in DIMACS:
 14306 -14307 -14308  0
c  -3 does not represent an automaton state.
c    -( b^{24, 32}_2 ∧  b^{24, 32}_1 ∧  b^{24, 32}_0 ∧ true) 
c  in CNF:
c    -b^{24, 32}_2 ∨ -b^{24, 32}_1 ∨ -b^{24, 32}_0 ∨ false 
c  in DIMACS:
-14306 -14307 -14308  0

c i = 33
c  -2+1 --> -1
c    ( b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧  p_792) -> ( b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0)
c  in CNF:
c    -b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨  b^{24, 34}_2
c    -b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_1
c    -b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨  b^{24, 34}_0
c  in DIMACS:
-14309 -14310  14311 -792  14312 0
-14309 -14310  14311 -792 -14313 0
-14309 -14310  14311 -792  14314 0

c  -1+1 --> 0
c    ( b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0 ∧  p_792) -> (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧ -b^{24, 34}_0)
c  in CNF:
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_2
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_1
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_0
c  in DIMACS:
-14309  14310 -14311 -792 -14312 0
-14309  14310 -14311 -792 -14313 0
-14309  14310 -14311 -792 -14314 0

c  0+1 --> 1
c    (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧  p_792) -> (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0)
c  in CNF:
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_2
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_1
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨  b^{24, 34}_0
c  in DIMACS:
 14309  14310  14311 -792 -14312 0
 14309  14310  14311 -792 -14313 0
 14309  14310  14311 -792  14314 0

c  1+1 --> 2
c    (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0 ∧  p_792) -> (-b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0)
c  in CNF:
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_2
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨  b^{24, 34}_1
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ -p_792 ∨ -b^{24, 34}_0
c  in DIMACS:
 14309  14310 -14311 -792 -14312 0
 14309  14310 -14311 -792  14313 0
 14309  14310 -14311 -792 -14314 0

c  2+1 --> break 
c    (-b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧  p_792) -> break
c  in CNF:
c     b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 14309 -14310  14311 -792 1162 0


c  2-1 --> 1
c    (-b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧ -p_792) -> (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0)
c  in CNF:
c     b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_2
c     b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_1
c     b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨  b^{24, 34}_0
c  in DIMACS:
 14309 -14310  14311  792 -14312 0
 14309 -14310  14311  792 -14313 0
 14309 -14310  14311  792  14314 0

c  1-1 --> 0
c    (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0 ∧ -p_792) -> (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧ -b^{24, 34}_0)
c  in CNF:
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_2
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_1
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_0
c  in DIMACS:
 14309  14310 -14311  792 -14312 0
 14309  14310 -14311  792 -14313 0
 14309  14310 -14311  792 -14314 0

c  0-1 --> -1
c    (-b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧ -p_792) -> ( b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0)
c  in CNF:
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨  b^{24, 34}_2
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_1
c     b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨  b^{24, 34}_0
c  in DIMACS:
 14309  14310  14311  792  14312 0
 14309  14310  14311  792 -14313 0
 14309  14310  14311  792  14314 0

c  -1-1 --> -2
c    ( b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧  b^{24, 33}_0 ∧ -p_792) -> ( b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0)
c  in CNF:
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨  b^{24, 34}_2
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨  b^{24, 34}_1
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨  p_792 ∨ -b^{24, 34}_0
c  in DIMACS:
-14309  14310 -14311  792  14312 0
-14309  14310 -14311  792  14313 0
-14309  14310 -14311  792 -14314 0

c  -2-1 --> break 
c    ( b^{24, 33}_2 ∧  b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨  b^{24, 33}_0 ∨  p_792 ∨ break
c  in DIMACS:
-14309 -14310  14311  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 33}_2 ∧ -b^{24, 33}_1 ∧ -b^{24, 33}_0 ∧ true) 
c  in CNF:
c    -b^{24, 33}_2 ∨  b^{24, 33}_1 ∨  b^{24, 33}_0 ∨ false 
c  in DIMACS:
-14309  14310  14311  0

c  3 does not represent an automaton state.
c    -(-b^{24, 33}_2 ∧  b^{24, 33}_1 ∧  b^{24, 33}_0 ∧ true) 
c  in CNF:
c     b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ false 
c  in DIMACS:
 14309 -14310 -14311  0
c  -3 does not represent an automaton state.
c    -( b^{24, 33}_2 ∧  b^{24, 33}_1 ∧  b^{24, 33}_0 ∧ true) 
c  in CNF:
c    -b^{24, 33}_2 ∨ -b^{24, 33}_1 ∨ -b^{24, 33}_0 ∨ false 
c  in DIMACS:
-14309 -14310 -14311  0

c i = 34
c  -2+1 --> -1
c    ( b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧  p_816) -> ( b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0)
c  in CNF:
c    -b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨  b^{24, 35}_2
c    -b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_1
c    -b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨  b^{24, 35}_0
c  in DIMACS:
-14312 -14313  14314 -816  14315 0
-14312 -14313  14314 -816 -14316 0
-14312 -14313  14314 -816  14317 0

c  -1+1 --> 0
c    ( b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0 ∧  p_816) -> (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧ -b^{24, 35}_0)
c  in CNF:
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_2
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_1
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_0
c  in DIMACS:
-14312  14313 -14314 -816 -14315 0
-14312  14313 -14314 -816 -14316 0
-14312  14313 -14314 -816 -14317 0

c  0+1 --> 1
c    (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧  p_816) -> (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0)
c  in CNF:
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_2
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_1
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨  b^{24, 35}_0
c  in DIMACS:
 14312  14313  14314 -816 -14315 0
 14312  14313  14314 -816 -14316 0
 14312  14313  14314 -816  14317 0

c  1+1 --> 2
c    (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0 ∧  p_816) -> (-b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0)
c  in CNF:
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_2
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨  b^{24, 35}_1
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ -p_816 ∨ -b^{24, 35}_0
c  in DIMACS:
 14312  14313 -14314 -816 -14315 0
 14312  14313 -14314 -816  14316 0
 14312  14313 -14314 -816 -14317 0

c  2+1 --> break 
c    (-b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧  p_816) -> break
c  in CNF:
c     b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 14312 -14313  14314 -816 1162 0


c  2-1 --> 1
c    (-b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧ -p_816) -> (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0)
c  in CNF:
c     b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_2
c     b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_1
c     b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨  b^{24, 35}_0
c  in DIMACS:
 14312 -14313  14314  816 -14315 0
 14312 -14313  14314  816 -14316 0
 14312 -14313  14314  816  14317 0

c  1-1 --> 0
c    (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0 ∧ -p_816) -> (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧ -b^{24, 35}_0)
c  in CNF:
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_2
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_1
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_0
c  in DIMACS:
 14312  14313 -14314  816 -14315 0
 14312  14313 -14314  816 -14316 0
 14312  14313 -14314  816 -14317 0

c  0-1 --> -1
c    (-b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧ -p_816) -> ( b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0)
c  in CNF:
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨  b^{24, 35}_2
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_1
c     b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨  b^{24, 35}_0
c  in DIMACS:
 14312  14313  14314  816  14315 0
 14312  14313  14314  816 -14316 0
 14312  14313  14314  816  14317 0

c  -1-1 --> -2
c    ( b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧  b^{24, 34}_0 ∧ -p_816) -> ( b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0)
c  in CNF:
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨  b^{24, 35}_2
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨  b^{24, 35}_1
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨  p_816 ∨ -b^{24, 35}_0
c  in DIMACS:
-14312  14313 -14314  816  14315 0
-14312  14313 -14314  816  14316 0
-14312  14313 -14314  816 -14317 0

c  -2-1 --> break 
c    ( b^{24, 34}_2 ∧  b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨  b^{24, 34}_0 ∨  p_816 ∨ break
c  in DIMACS:
-14312 -14313  14314  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 34}_2 ∧ -b^{24, 34}_1 ∧ -b^{24, 34}_0 ∧ true) 
c  in CNF:
c    -b^{24, 34}_2 ∨  b^{24, 34}_1 ∨  b^{24, 34}_0 ∨ false 
c  in DIMACS:
-14312  14313  14314  0

c  3 does not represent an automaton state.
c    -(-b^{24, 34}_2 ∧  b^{24, 34}_1 ∧  b^{24, 34}_0 ∧ true) 
c  in CNF:
c     b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ false 
c  in DIMACS:
 14312 -14313 -14314  0
c  -3 does not represent an automaton state.
c    -( b^{24, 34}_2 ∧  b^{24, 34}_1 ∧  b^{24, 34}_0 ∧ true) 
c  in CNF:
c    -b^{24, 34}_2 ∨ -b^{24, 34}_1 ∨ -b^{24, 34}_0 ∨ false 
c  in DIMACS:
-14312 -14313 -14314  0

c i = 35
c  -2+1 --> -1
c    ( b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧  p_840) -> ( b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0)
c  in CNF:
c    -b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨  b^{24, 36}_2
c    -b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_1
c    -b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨  b^{24, 36}_0
c  in DIMACS:
-14315 -14316  14317 -840  14318 0
-14315 -14316  14317 -840 -14319 0
-14315 -14316  14317 -840  14320 0

c  -1+1 --> 0
c    ( b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0 ∧  p_840) -> (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧ -b^{24, 36}_0)
c  in CNF:
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_2
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_1
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_0
c  in DIMACS:
-14315  14316 -14317 -840 -14318 0
-14315  14316 -14317 -840 -14319 0
-14315  14316 -14317 -840 -14320 0

c  0+1 --> 1
c    (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧  p_840) -> (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0)
c  in CNF:
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_2
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_1
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨  b^{24, 36}_0
c  in DIMACS:
 14315  14316  14317 -840 -14318 0
 14315  14316  14317 -840 -14319 0
 14315  14316  14317 -840  14320 0

c  1+1 --> 2
c    (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0 ∧  p_840) -> (-b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0)
c  in CNF:
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_2
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨  b^{24, 36}_1
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ -p_840 ∨ -b^{24, 36}_0
c  in DIMACS:
 14315  14316 -14317 -840 -14318 0
 14315  14316 -14317 -840  14319 0
 14315  14316 -14317 -840 -14320 0

c  2+1 --> break 
c    (-b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧  p_840) -> break
c  in CNF:
c     b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 14315 -14316  14317 -840 1162 0


c  2-1 --> 1
c    (-b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧ -p_840) -> (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0)
c  in CNF:
c     b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_2
c     b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_1
c     b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨  b^{24, 36}_0
c  in DIMACS:
 14315 -14316  14317  840 -14318 0
 14315 -14316  14317  840 -14319 0
 14315 -14316  14317  840  14320 0

c  1-1 --> 0
c    (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0 ∧ -p_840) -> (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧ -b^{24, 36}_0)
c  in CNF:
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_2
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_1
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_0
c  in DIMACS:
 14315  14316 -14317  840 -14318 0
 14315  14316 -14317  840 -14319 0
 14315  14316 -14317  840 -14320 0

c  0-1 --> -1
c    (-b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧ -p_840) -> ( b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0)
c  in CNF:
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨  b^{24, 36}_2
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_1
c     b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨  b^{24, 36}_0
c  in DIMACS:
 14315  14316  14317  840  14318 0
 14315  14316  14317  840 -14319 0
 14315  14316  14317  840  14320 0

c  -1-1 --> -2
c    ( b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧  b^{24, 35}_0 ∧ -p_840) -> ( b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0)
c  in CNF:
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨  b^{24, 36}_2
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨  b^{24, 36}_1
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨  p_840 ∨ -b^{24, 36}_0
c  in DIMACS:
-14315  14316 -14317  840  14318 0
-14315  14316 -14317  840  14319 0
-14315  14316 -14317  840 -14320 0

c  -2-1 --> break 
c    ( b^{24, 35}_2 ∧  b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨  b^{24, 35}_0 ∨  p_840 ∨ break
c  in DIMACS:
-14315 -14316  14317  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 35}_2 ∧ -b^{24, 35}_1 ∧ -b^{24, 35}_0 ∧ true) 
c  in CNF:
c    -b^{24, 35}_2 ∨  b^{24, 35}_1 ∨  b^{24, 35}_0 ∨ false 
c  in DIMACS:
-14315  14316  14317  0

c  3 does not represent an automaton state.
c    -(-b^{24, 35}_2 ∧  b^{24, 35}_1 ∧  b^{24, 35}_0 ∧ true) 
c  in CNF:
c     b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ false 
c  in DIMACS:
 14315 -14316 -14317  0
c  -3 does not represent an automaton state.
c    -( b^{24, 35}_2 ∧  b^{24, 35}_1 ∧  b^{24, 35}_0 ∧ true) 
c  in CNF:
c    -b^{24, 35}_2 ∨ -b^{24, 35}_1 ∨ -b^{24, 35}_0 ∨ false 
c  in DIMACS:
-14315 -14316 -14317  0

c i = 36
c  -2+1 --> -1
c    ( b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧  p_864) -> ( b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0)
c  in CNF:
c    -b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨  b^{24, 37}_2
c    -b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_1
c    -b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨  b^{24, 37}_0
c  in DIMACS:
-14318 -14319  14320 -864  14321 0
-14318 -14319  14320 -864 -14322 0
-14318 -14319  14320 -864  14323 0

c  -1+1 --> 0
c    ( b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0 ∧  p_864) -> (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧ -b^{24, 37}_0)
c  in CNF:
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_2
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_1
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_0
c  in DIMACS:
-14318  14319 -14320 -864 -14321 0
-14318  14319 -14320 -864 -14322 0
-14318  14319 -14320 -864 -14323 0

c  0+1 --> 1
c    (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧  p_864) -> (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0)
c  in CNF:
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_2
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_1
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨  b^{24, 37}_0
c  in DIMACS:
 14318  14319  14320 -864 -14321 0
 14318  14319  14320 -864 -14322 0
 14318  14319  14320 -864  14323 0

c  1+1 --> 2
c    (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0 ∧  p_864) -> (-b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0)
c  in CNF:
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_2
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨  b^{24, 37}_1
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ -p_864 ∨ -b^{24, 37}_0
c  in DIMACS:
 14318  14319 -14320 -864 -14321 0
 14318  14319 -14320 -864  14322 0
 14318  14319 -14320 -864 -14323 0

c  2+1 --> break 
c    (-b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧  p_864) -> break
c  in CNF:
c     b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 14318 -14319  14320 -864 1162 0


c  2-1 --> 1
c    (-b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧ -p_864) -> (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0)
c  in CNF:
c     b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_2
c     b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_1
c     b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨  b^{24, 37}_0
c  in DIMACS:
 14318 -14319  14320  864 -14321 0
 14318 -14319  14320  864 -14322 0
 14318 -14319  14320  864  14323 0

c  1-1 --> 0
c    (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0 ∧ -p_864) -> (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧ -b^{24, 37}_0)
c  in CNF:
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_2
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_1
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_0
c  in DIMACS:
 14318  14319 -14320  864 -14321 0
 14318  14319 -14320  864 -14322 0
 14318  14319 -14320  864 -14323 0

c  0-1 --> -1
c    (-b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧ -p_864) -> ( b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0)
c  in CNF:
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨  b^{24, 37}_2
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_1
c     b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨  b^{24, 37}_0
c  in DIMACS:
 14318  14319  14320  864  14321 0
 14318  14319  14320  864 -14322 0
 14318  14319  14320  864  14323 0

c  -1-1 --> -2
c    ( b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧  b^{24, 36}_0 ∧ -p_864) -> ( b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0)
c  in CNF:
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨  b^{24, 37}_2
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨  b^{24, 37}_1
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨  p_864 ∨ -b^{24, 37}_0
c  in DIMACS:
-14318  14319 -14320  864  14321 0
-14318  14319 -14320  864  14322 0
-14318  14319 -14320  864 -14323 0

c  -2-1 --> break 
c    ( b^{24, 36}_2 ∧  b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨  b^{24, 36}_0 ∨  p_864 ∨ break
c  in DIMACS:
-14318 -14319  14320  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 36}_2 ∧ -b^{24, 36}_1 ∧ -b^{24, 36}_0 ∧ true) 
c  in CNF:
c    -b^{24, 36}_2 ∨  b^{24, 36}_1 ∨  b^{24, 36}_0 ∨ false 
c  in DIMACS:
-14318  14319  14320  0

c  3 does not represent an automaton state.
c    -(-b^{24, 36}_2 ∧  b^{24, 36}_1 ∧  b^{24, 36}_0 ∧ true) 
c  in CNF:
c     b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ false 
c  in DIMACS:
 14318 -14319 -14320  0
c  -3 does not represent an automaton state.
c    -( b^{24, 36}_2 ∧  b^{24, 36}_1 ∧  b^{24, 36}_0 ∧ true) 
c  in CNF:
c    -b^{24, 36}_2 ∨ -b^{24, 36}_1 ∨ -b^{24, 36}_0 ∨ false 
c  in DIMACS:
-14318 -14319 -14320  0

c i = 37
c  -2+1 --> -1
c    ( b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧  p_888) -> ( b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0)
c  in CNF:
c    -b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨  b^{24, 38}_2
c    -b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_1
c    -b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨  b^{24, 38}_0
c  in DIMACS:
-14321 -14322  14323 -888  14324 0
-14321 -14322  14323 -888 -14325 0
-14321 -14322  14323 -888  14326 0

c  -1+1 --> 0
c    ( b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0 ∧  p_888) -> (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧ -b^{24, 38}_0)
c  in CNF:
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_2
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_1
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_0
c  in DIMACS:
-14321  14322 -14323 -888 -14324 0
-14321  14322 -14323 -888 -14325 0
-14321  14322 -14323 -888 -14326 0

c  0+1 --> 1
c    (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧  p_888) -> (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0)
c  in CNF:
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_2
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_1
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨  b^{24, 38}_0
c  in DIMACS:
 14321  14322  14323 -888 -14324 0
 14321  14322  14323 -888 -14325 0
 14321  14322  14323 -888  14326 0

c  1+1 --> 2
c    (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0 ∧  p_888) -> (-b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0)
c  in CNF:
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_2
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨  b^{24, 38}_1
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ -p_888 ∨ -b^{24, 38}_0
c  in DIMACS:
 14321  14322 -14323 -888 -14324 0
 14321  14322 -14323 -888  14325 0
 14321  14322 -14323 -888 -14326 0

c  2+1 --> break 
c    (-b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧  p_888) -> break
c  in CNF:
c     b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 14321 -14322  14323 -888 1162 0


c  2-1 --> 1
c    (-b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧ -p_888) -> (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0)
c  in CNF:
c     b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_2
c     b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_1
c     b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨  b^{24, 38}_0
c  in DIMACS:
 14321 -14322  14323  888 -14324 0
 14321 -14322  14323  888 -14325 0
 14321 -14322  14323  888  14326 0

c  1-1 --> 0
c    (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0 ∧ -p_888) -> (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧ -b^{24, 38}_0)
c  in CNF:
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_2
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_1
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_0
c  in DIMACS:
 14321  14322 -14323  888 -14324 0
 14321  14322 -14323  888 -14325 0
 14321  14322 -14323  888 -14326 0

c  0-1 --> -1
c    (-b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧ -p_888) -> ( b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0)
c  in CNF:
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨  b^{24, 38}_2
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_1
c     b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨  b^{24, 38}_0
c  in DIMACS:
 14321  14322  14323  888  14324 0
 14321  14322  14323  888 -14325 0
 14321  14322  14323  888  14326 0

c  -1-1 --> -2
c    ( b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧  b^{24, 37}_0 ∧ -p_888) -> ( b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0)
c  in CNF:
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨  b^{24, 38}_2
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨  b^{24, 38}_1
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨  p_888 ∨ -b^{24, 38}_0
c  in DIMACS:
-14321  14322 -14323  888  14324 0
-14321  14322 -14323  888  14325 0
-14321  14322 -14323  888 -14326 0

c  -2-1 --> break 
c    ( b^{24, 37}_2 ∧  b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨  b^{24, 37}_0 ∨  p_888 ∨ break
c  in DIMACS:
-14321 -14322  14323  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 37}_2 ∧ -b^{24, 37}_1 ∧ -b^{24, 37}_0 ∧ true) 
c  in CNF:
c    -b^{24, 37}_2 ∨  b^{24, 37}_1 ∨  b^{24, 37}_0 ∨ false 
c  in DIMACS:
-14321  14322  14323  0

c  3 does not represent an automaton state.
c    -(-b^{24, 37}_2 ∧  b^{24, 37}_1 ∧  b^{24, 37}_0 ∧ true) 
c  in CNF:
c     b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ false 
c  in DIMACS:
 14321 -14322 -14323  0
c  -3 does not represent an automaton state.
c    -( b^{24, 37}_2 ∧  b^{24, 37}_1 ∧  b^{24, 37}_0 ∧ true) 
c  in CNF:
c    -b^{24, 37}_2 ∨ -b^{24, 37}_1 ∨ -b^{24, 37}_0 ∨ false 
c  in DIMACS:
-14321 -14322 -14323  0

c i = 38
c  -2+1 --> -1
c    ( b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧  p_912) -> ( b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0)
c  in CNF:
c    -b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨  b^{24, 39}_2
c    -b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_1
c    -b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨  b^{24, 39}_0
c  in DIMACS:
-14324 -14325  14326 -912  14327 0
-14324 -14325  14326 -912 -14328 0
-14324 -14325  14326 -912  14329 0

c  -1+1 --> 0
c    ( b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0 ∧  p_912) -> (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧ -b^{24, 39}_0)
c  in CNF:
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_2
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_1
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_0
c  in DIMACS:
-14324  14325 -14326 -912 -14327 0
-14324  14325 -14326 -912 -14328 0
-14324  14325 -14326 -912 -14329 0

c  0+1 --> 1
c    (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧  p_912) -> (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0)
c  in CNF:
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_2
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_1
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨  b^{24, 39}_0
c  in DIMACS:
 14324  14325  14326 -912 -14327 0
 14324  14325  14326 -912 -14328 0
 14324  14325  14326 -912  14329 0

c  1+1 --> 2
c    (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0 ∧  p_912) -> (-b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0)
c  in CNF:
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_2
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨  b^{24, 39}_1
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ -p_912 ∨ -b^{24, 39}_0
c  in DIMACS:
 14324  14325 -14326 -912 -14327 0
 14324  14325 -14326 -912  14328 0
 14324  14325 -14326 -912 -14329 0

c  2+1 --> break 
c    (-b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧  p_912) -> break
c  in CNF:
c     b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 14324 -14325  14326 -912 1162 0


c  2-1 --> 1
c    (-b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧ -p_912) -> (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0)
c  in CNF:
c     b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_2
c     b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_1
c     b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨  b^{24, 39}_0
c  in DIMACS:
 14324 -14325  14326  912 -14327 0
 14324 -14325  14326  912 -14328 0
 14324 -14325  14326  912  14329 0

c  1-1 --> 0
c    (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0 ∧ -p_912) -> (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧ -b^{24, 39}_0)
c  in CNF:
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_2
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_1
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_0
c  in DIMACS:
 14324  14325 -14326  912 -14327 0
 14324  14325 -14326  912 -14328 0
 14324  14325 -14326  912 -14329 0

c  0-1 --> -1
c    (-b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧ -p_912) -> ( b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0)
c  in CNF:
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨  b^{24, 39}_2
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_1
c     b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨  b^{24, 39}_0
c  in DIMACS:
 14324  14325  14326  912  14327 0
 14324  14325  14326  912 -14328 0
 14324  14325  14326  912  14329 0

c  -1-1 --> -2
c    ( b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧  b^{24, 38}_0 ∧ -p_912) -> ( b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0)
c  in CNF:
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨  b^{24, 39}_2
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨  b^{24, 39}_1
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨  p_912 ∨ -b^{24, 39}_0
c  in DIMACS:
-14324  14325 -14326  912  14327 0
-14324  14325 -14326  912  14328 0
-14324  14325 -14326  912 -14329 0

c  -2-1 --> break 
c    ( b^{24, 38}_2 ∧  b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨  b^{24, 38}_0 ∨  p_912 ∨ break
c  in DIMACS:
-14324 -14325  14326  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 38}_2 ∧ -b^{24, 38}_1 ∧ -b^{24, 38}_0 ∧ true) 
c  in CNF:
c    -b^{24, 38}_2 ∨  b^{24, 38}_1 ∨  b^{24, 38}_0 ∨ false 
c  in DIMACS:
-14324  14325  14326  0

c  3 does not represent an automaton state.
c    -(-b^{24, 38}_2 ∧  b^{24, 38}_1 ∧  b^{24, 38}_0 ∧ true) 
c  in CNF:
c     b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ false 
c  in DIMACS:
 14324 -14325 -14326  0
c  -3 does not represent an automaton state.
c    -( b^{24, 38}_2 ∧  b^{24, 38}_1 ∧  b^{24, 38}_0 ∧ true) 
c  in CNF:
c    -b^{24, 38}_2 ∨ -b^{24, 38}_1 ∨ -b^{24, 38}_0 ∨ false 
c  in DIMACS:
-14324 -14325 -14326  0

c i = 39
c  -2+1 --> -1
c    ( b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧  p_936) -> ( b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0)
c  in CNF:
c    -b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨  b^{24, 40}_2
c    -b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_1
c    -b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨  b^{24, 40}_0
c  in DIMACS:
-14327 -14328  14329 -936  14330 0
-14327 -14328  14329 -936 -14331 0
-14327 -14328  14329 -936  14332 0

c  -1+1 --> 0
c    ( b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0 ∧  p_936) -> (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧ -b^{24, 40}_0)
c  in CNF:
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_2
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_1
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_0
c  in DIMACS:
-14327  14328 -14329 -936 -14330 0
-14327  14328 -14329 -936 -14331 0
-14327  14328 -14329 -936 -14332 0

c  0+1 --> 1
c    (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧  p_936) -> (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0)
c  in CNF:
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_2
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_1
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨  b^{24, 40}_0
c  in DIMACS:
 14327  14328  14329 -936 -14330 0
 14327  14328  14329 -936 -14331 0
 14327  14328  14329 -936  14332 0

c  1+1 --> 2
c    (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0 ∧  p_936) -> (-b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0)
c  in CNF:
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_2
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨  b^{24, 40}_1
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ -p_936 ∨ -b^{24, 40}_0
c  in DIMACS:
 14327  14328 -14329 -936 -14330 0
 14327  14328 -14329 -936  14331 0
 14327  14328 -14329 -936 -14332 0

c  2+1 --> break 
c    (-b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧  p_936) -> break
c  in CNF:
c     b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 14327 -14328  14329 -936 1162 0


c  2-1 --> 1
c    (-b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧ -p_936) -> (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0)
c  in CNF:
c     b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_2
c     b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_1
c     b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨  b^{24, 40}_0
c  in DIMACS:
 14327 -14328  14329  936 -14330 0
 14327 -14328  14329  936 -14331 0
 14327 -14328  14329  936  14332 0

c  1-1 --> 0
c    (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0 ∧ -p_936) -> (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧ -b^{24, 40}_0)
c  in CNF:
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_2
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_1
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_0
c  in DIMACS:
 14327  14328 -14329  936 -14330 0
 14327  14328 -14329  936 -14331 0
 14327  14328 -14329  936 -14332 0

c  0-1 --> -1
c    (-b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧ -p_936) -> ( b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0)
c  in CNF:
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨  b^{24, 40}_2
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_1
c     b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨  b^{24, 40}_0
c  in DIMACS:
 14327  14328  14329  936  14330 0
 14327  14328  14329  936 -14331 0
 14327  14328  14329  936  14332 0

c  -1-1 --> -2
c    ( b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧  b^{24, 39}_0 ∧ -p_936) -> ( b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0)
c  in CNF:
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨  b^{24, 40}_2
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨  b^{24, 40}_1
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨  p_936 ∨ -b^{24, 40}_0
c  in DIMACS:
-14327  14328 -14329  936  14330 0
-14327  14328 -14329  936  14331 0
-14327  14328 -14329  936 -14332 0

c  -2-1 --> break 
c    ( b^{24, 39}_2 ∧  b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨  b^{24, 39}_0 ∨  p_936 ∨ break
c  in DIMACS:
-14327 -14328  14329  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 39}_2 ∧ -b^{24, 39}_1 ∧ -b^{24, 39}_0 ∧ true) 
c  in CNF:
c    -b^{24, 39}_2 ∨  b^{24, 39}_1 ∨  b^{24, 39}_0 ∨ false 
c  in DIMACS:
-14327  14328  14329  0

c  3 does not represent an automaton state.
c    -(-b^{24, 39}_2 ∧  b^{24, 39}_1 ∧  b^{24, 39}_0 ∧ true) 
c  in CNF:
c     b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ false 
c  in DIMACS:
 14327 -14328 -14329  0
c  -3 does not represent an automaton state.
c    -( b^{24, 39}_2 ∧  b^{24, 39}_1 ∧  b^{24, 39}_0 ∧ true) 
c  in CNF:
c    -b^{24, 39}_2 ∨ -b^{24, 39}_1 ∨ -b^{24, 39}_0 ∨ false 
c  in DIMACS:
-14327 -14328 -14329  0

c i = 40
c  -2+1 --> -1
c    ( b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧  p_960) -> ( b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0)
c  in CNF:
c    -b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨  b^{24, 41}_2
c    -b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_1
c    -b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨  b^{24, 41}_0
c  in DIMACS:
-14330 -14331  14332 -960  14333 0
-14330 -14331  14332 -960 -14334 0
-14330 -14331  14332 -960  14335 0

c  -1+1 --> 0
c    ( b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0 ∧  p_960) -> (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧ -b^{24, 41}_0)
c  in CNF:
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_2
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_1
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_0
c  in DIMACS:
-14330  14331 -14332 -960 -14333 0
-14330  14331 -14332 -960 -14334 0
-14330  14331 -14332 -960 -14335 0

c  0+1 --> 1
c    (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧  p_960) -> (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0)
c  in CNF:
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_2
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_1
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨  b^{24, 41}_0
c  in DIMACS:
 14330  14331  14332 -960 -14333 0
 14330  14331  14332 -960 -14334 0
 14330  14331  14332 -960  14335 0

c  1+1 --> 2
c    (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0 ∧  p_960) -> (-b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0)
c  in CNF:
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_2
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨  b^{24, 41}_1
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ -p_960 ∨ -b^{24, 41}_0
c  in DIMACS:
 14330  14331 -14332 -960 -14333 0
 14330  14331 -14332 -960  14334 0
 14330  14331 -14332 -960 -14335 0

c  2+1 --> break 
c    (-b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧  p_960) -> break
c  in CNF:
c     b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 14330 -14331  14332 -960 1162 0


c  2-1 --> 1
c    (-b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧ -p_960) -> (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0)
c  in CNF:
c     b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_2
c     b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_1
c     b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨  b^{24, 41}_0
c  in DIMACS:
 14330 -14331  14332  960 -14333 0
 14330 -14331  14332  960 -14334 0
 14330 -14331  14332  960  14335 0

c  1-1 --> 0
c    (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0 ∧ -p_960) -> (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧ -b^{24, 41}_0)
c  in CNF:
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_2
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_1
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_0
c  in DIMACS:
 14330  14331 -14332  960 -14333 0
 14330  14331 -14332  960 -14334 0
 14330  14331 -14332  960 -14335 0

c  0-1 --> -1
c    (-b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧ -p_960) -> ( b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0)
c  in CNF:
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨  b^{24, 41}_2
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_1
c     b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨  b^{24, 41}_0
c  in DIMACS:
 14330  14331  14332  960  14333 0
 14330  14331  14332  960 -14334 0
 14330  14331  14332  960  14335 0

c  -1-1 --> -2
c    ( b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧  b^{24, 40}_0 ∧ -p_960) -> ( b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0)
c  in CNF:
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨  b^{24, 41}_2
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨  b^{24, 41}_1
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨  p_960 ∨ -b^{24, 41}_0
c  in DIMACS:
-14330  14331 -14332  960  14333 0
-14330  14331 -14332  960  14334 0
-14330  14331 -14332  960 -14335 0

c  -2-1 --> break 
c    ( b^{24, 40}_2 ∧  b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨  b^{24, 40}_0 ∨  p_960 ∨ break
c  in DIMACS:
-14330 -14331  14332  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 40}_2 ∧ -b^{24, 40}_1 ∧ -b^{24, 40}_0 ∧ true) 
c  in CNF:
c    -b^{24, 40}_2 ∨  b^{24, 40}_1 ∨  b^{24, 40}_0 ∨ false 
c  in DIMACS:
-14330  14331  14332  0

c  3 does not represent an automaton state.
c    -(-b^{24, 40}_2 ∧  b^{24, 40}_1 ∧  b^{24, 40}_0 ∧ true) 
c  in CNF:
c     b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ false 
c  in DIMACS:
 14330 -14331 -14332  0
c  -3 does not represent an automaton state.
c    -( b^{24, 40}_2 ∧  b^{24, 40}_1 ∧  b^{24, 40}_0 ∧ true) 
c  in CNF:
c    -b^{24, 40}_2 ∨ -b^{24, 40}_1 ∨ -b^{24, 40}_0 ∨ false 
c  in DIMACS:
-14330 -14331 -14332  0

c i = 41
c  -2+1 --> -1
c    ( b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧  p_984) -> ( b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0)
c  in CNF:
c    -b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨  b^{24, 42}_2
c    -b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_1
c    -b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨  b^{24, 42}_0
c  in DIMACS:
-14333 -14334  14335 -984  14336 0
-14333 -14334  14335 -984 -14337 0
-14333 -14334  14335 -984  14338 0

c  -1+1 --> 0
c    ( b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0 ∧  p_984) -> (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧ -b^{24, 42}_0)
c  in CNF:
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_2
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_1
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_0
c  in DIMACS:
-14333  14334 -14335 -984 -14336 0
-14333  14334 -14335 -984 -14337 0
-14333  14334 -14335 -984 -14338 0

c  0+1 --> 1
c    (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧  p_984) -> (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0)
c  in CNF:
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_2
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_1
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨  b^{24, 42}_0
c  in DIMACS:
 14333  14334  14335 -984 -14336 0
 14333  14334  14335 -984 -14337 0
 14333  14334  14335 -984  14338 0

c  1+1 --> 2
c    (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0 ∧  p_984) -> (-b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0)
c  in CNF:
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_2
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨  b^{24, 42}_1
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ -p_984 ∨ -b^{24, 42}_0
c  in DIMACS:
 14333  14334 -14335 -984 -14336 0
 14333  14334 -14335 -984  14337 0
 14333  14334 -14335 -984 -14338 0

c  2+1 --> break 
c    (-b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧  p_984) -> break
c  in CNF:
c     b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 14333 -14334  14335 -984 1162 0


c  2-1 --> 1
c    (-b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧ -p_984) -> (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0)
c  in CNF:
c     b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_2
c     b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_1
c     b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨  b^{24, 42}_0
c  in DIMACS:
 14333 -14334  14335  984 -14336 0
 14333 -14334  14335  984 -14337 0
 14333 -14334  14335  984  14338 0

c  1-1 --> 0
c    (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0 ∧ -p_984) -> (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧ -b^{24, 42}_0)
c  in CNF:
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_2
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_1
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_0
c  in DIMACS:
 14333  14334 -14335  984 -14336 0
 14333  14334 -14335  984 -14337 0
 14333  14334 -14335  984 -14338 0

c  0-1 --> -1
c    (-b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧ -p_984) -> ( b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0)
c  in CNF:
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨  b^{24, 42}_2
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_1
c     b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨  b^{24, 42}_0
c  in DIMACS:
 14333  14334  14335  984  14336 0
 14333  14334  14335  984 -14337 0
 14333  14334  14335  984  14338 0

c  -1-1 --> -2
c    ( b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧  b^{24, 41}_0 ∧ -p_984) -> ( b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0)
c  in CNF:
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨  b^{24, 42}_2
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨  b^{24, 42}_1
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨  p_984 ∨ -b^{24, 42}_0
c  in DIMACS:
-14333  14334 -14335  984  14336 0
-14333  14334 -14335  984  14337 0
-14333  14334 -14335  984 -14338 0

c  -2-1 --> break 
c    ( b^{24, 41}_2 ∧  b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨  b^{24, 41}_0 ∨  p_984 ∨ break
c  in DIMACS:
-14333 -14334  14335  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 41}_2 ∧ -b^{24, 41}_1 ∧ -b^{24, 41}_0 ∧ true) 
c  in CNF:
c    -b^{24, 41}_2 ∨  b^{24, 41}_1 ∨  b^{24, 41}_0 ∨ false 
c  in DIMACS:
-14333  14334  14335  0

c  3 does not represent an automaton state.
c    -(-b^{24, 41}_2 ∧  b^{24, 41}_1 ∧  b^{24, 41}_0 ∧ true) 
c  in CNF:
c     b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ false 
c  in DIMACS:
 14333 -14334 -14335  0
c  -3 does not represent an automaton state.
c    -( b^{24, 41}_2 ∧  b^{24, 41}_1 ∧  b^{24, 41}_0 ∧ true) 
c  in CNF:
c    -b^{24, 41}_2 ∨ -b^{24, 41}_1 ∨ -b^{24, 41}_0 ∨ false 
c  in DIMACS:
-14333 -14334 -14335  0

c i = 42
c  -2+1 --> -1
c    ( b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧  p_1008) -> ( b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0)
c  in CNF:
c    -b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨  b^{24, 43}_2
c    -b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_1
c    -b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨  b^{24, 43}_0
c  in DIMACS:
-14336 -14337  14338 -1008  14339 0
-14336 -14337  14338 -1008 -14340 0
-14336 -14337  14338 -1008  14341 0

c  -1+1 --> 0
c    ( b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0 ∧  p_1008) -> (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧ -b^{24, 43}_0)
c  in CNF:
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_2
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_1
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_0
c  in DIMACS:
-14336  14337 -14338 -1008 -14339 0
-14336  14337 -14338 -1008 -14340 0
-14336  14337 -14338 -1008 -14341 0

c  0+1 --> 1
c    (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧  p_1008) -> (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0)
c  in CNF:
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_2
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_1
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨  b^{24, 43}_0
c  in DIMACS:
 14336  14337  14338 -1008 -14339 0
 14336  14337  14338 -1008 -14340 0
 14336  14337  14338 -1008  14341 0

c  1+1 --> 2
c    (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0 ∧  p_1008) -> (-b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0)
c  in CNF:
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_2
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨  b^{24, 43}_1
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ -p_1008 ∨ -b^{24, 43}_0
c  in DIMACS:
 14336  14337 -14338 -1008 -14339 0
 14336  14337 -14338 -1008  14340 0
 14336  14337 -14338 -1008 -14341 0

c  2+1 --> break 
c    (-b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 14336 -14337  14338 -1008 1162 0


c  2-1 --> 1
c    (-b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧ -p_1008) -> (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0)
c  in CNF:
c     b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_2
c     b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_1
c     b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨  b^{24, 43}_0
c  in DIMACS:
 14336 -14337  14338  1008 -14339 0
 14336 -14337  14338  1008 -14340 0
 14336 -14337  14338  1008  14341 0

c  1-1 --> 0
c    (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0 ∧ -p_1008) -> (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧ -b^{24, 43}_0)
c  in CNF:
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_2
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_1
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_0
c  in DIMACS:
 14336  14337 -14338  1008 -14339 0
 14336  14337 -14338  1008 -14340 0
 14336  14337 -14338  1008 -14341 0

c  0-1 --> -1
c    (-b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧ -p_1008) -> ( b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0)
c  in CNF:
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨  b^{24, 43}_2
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_1
c     b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨  b^{24, 43}_0
c  in DIMACS:
 14336  14337  14338  1008  14339 0
 14336  14337  14338  1008 -14340 0
 14336  14337  14338  1008  14341 0

c  -1-1 --> -2
c    ( b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧  b^{24, 42}_0 ∧ -p_1008) -> ( b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0)
c  in CNF:
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨  b^{24, 43}_2
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨  b^{24, 43}_1
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨  p_1008 ∨ -b^{24, 43}_0
c  in DIMACS:
-14336  14337 -14338  1008  14339 0
-14336  14337 -14338  1008  14340 0
-14336  14337 -14338  1008 -14341 0

c  -2-1 --> break 
c    ( b^{24, 42}_2 ∧  b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨  b^{24, 42}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-14336 -14337  14338  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 42}_2 ∧ -b^{24, 42}_1 ∧ -b^{24, 42}_0 ∧ true) 
c  in CNF:
c    -b^{24, 42}_2 ∨  b^{24, 42}_1 ∨  b^{24, 42}_0 ∨ false 
c  in DIMACS:
-14336  14337  14338  0

c  3 does not represent an automaton state.
c    -(-b^{24, 42}_2 ∧  b^{24, 42}_1 ∧  b^{24, 42}_0 ∧ true) 
c  in CNF:
c     b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ false 
c  in DIMACS:
 14336 -14337 -14338  0
c  -3 does not represent an automaton state.
c    -( b^{24, 42}_2 ∧  b^{24, 42}_1 ∧  b^{24, 42}_0 ∧ true) 
c  in CNF:
c    -b^{24, 42}_2 ∨ -b^{24, 42}_1 ∨ -b^{24, 42}_0 ∨ false 
c  in DIMACS:
-14336 -14337 -14338  0

c i = 43
c  -2+1 --> -1
c    ( b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧  p_1032) -> ( b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0)
c  in CNF:
c    -b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨  b^{24, 44}_2
c    -b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_1
c    -b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨  b^{24, 44}_0
c  in DIMACS:
-14339 -14340  14341 -1032  14342 0
-14339 -14340  14341 -1032 -14343 0
-14339 -14340  14341 -1032  14344 0

c  -1+1 --> 0
c    ( b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0 ∧  p_1032) -> (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧ -b^{24, 44}_0)
c  in CNF:
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_2
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_1
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_0
c  in DIMACS:
-14339  14340 -14341 -1032 -14342 0
-14339  14340 -14341 -1032 -14343 0
-14339  14340 -14341 -1032 -14344 0

c  0+1 --> 1
c    (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧  p_1032) -> (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0)
c  in CNF:
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_2
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_1
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨  b^{24, 44}_0
c  in DIMACS:
 14339  14340  14341 -1032 -14342 0
 14339  14340  14341 -1032 -14343 0
 14339  14340  14341 -1032  14344 0

c  1+1 --> 2
c    (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0 ∧  p_1032) -> (-b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0)
c  in CNF:
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_2
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨  b^{24, 44}_1
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ -p_1032 ∨ -b^{24, 44}_0
c  in DIMACS:
 14339  14340 -14341 -1032 -14342 0
 14339  14340 -14341 -1032  14343 0
 14339  14340 -14341 -1032 -14344 0

c  2+1 --> break 
c    (-b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 14339 -14340  14341 -1032 1162 0


c  2-1 --> 1
c    (-b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧ -p_1032) -> (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0)
c  in CNF:
c     b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_2
c     b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_1
c     b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨  b^{24, 44}_0
c  in DIMACS:
 14339 -14340  14341  1032 -14342 0
 14339 -14340  14341  1032 -14343 0
 14339 -14340  14341  1032  14344 0

c  1-1 --> 0
c    (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0 ∧ -p_1032) -> (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧ -b^{24, 44}_0)
c  in CNF:
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_2
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_1
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_0
c  in DIMACS:
 14339  14340 -14341  1032 -14342 0
 14339  14340 -14341  1032 -14343 0
 14339  14340 -14341  1032 -14344 0

c  0-1 --> -1
c    (-b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧ -p_1032) -> ( b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0)
c  in CNF:
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨  b^{24, 44}_2
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_1
c     b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨  b^{24, 44}_0
c  in DIMACS:
 14339  14340  14341  1032  14342 0
 14339  14340  14341  1032 -14343 0
 14339  14340  14341  1032  14344 0

c  -1-1 --> -2
c    ( b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧  b^{24, 43}_0 ∧ -p_1032) -> ( b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0)
c  in CNF:
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨  b^{24, 44}_2
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨  b^{24, 44}_1
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨  p_1032 ∨ -b^{24, 44}_0
c  in DIMACS:
-14339  14340 -14341  1032  14342 0
-14339  14340 -14341  1032  14343 0
-14339  14340 -14341  1032 -14344 0

c  -2-1 --> break 
c    ( b^{24, 43}_2 ∧  b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨  b^{24, 43}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-14339 -14340  14341  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 43}_2 ∧ -b^{24, 43}_1 ∧ -b^{24, 43}_0 ∧ true) 
c  in CNF:
c    -b^{24, 43}_2 ∨  b^{24, 43}_1 ∨  b^{24, 43}_0 ∨ false 
c  in DIMACS:
-14339  14340  14341  0

c  3 does not represent an automaton state.
c    -(-b^{24, 43}_2 ∧  b^{24, 43}_1 ∧  b^{24, 43}_0 ∧ true) 
c  in CNF:
c     b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ false 
c  in DIMACS:
 14339 -14340 -14341  0
c  -3 does not represent an automaton state.
c    -( b^{24, 43}_2 ∧  b^{24, 43}_1 ∧  b^{24, 43}_0 ∧ true) 
c  in CNF:
c    -b^{24, 43}_2 ∨ -b^{24, 43}_1 ∨ -b^{24, 43}_0 ∨ false 
c  in DIMACS:
-14339 -14340 -14341  0

c i = 44
c  -2+1 --> -1
c    ( b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧  p_1056) -> ( b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0)
c  in CNF:
c    -b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨  b^{24, 45}_2
c    -b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_1
c    -b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨  b^{24, 45}_0
c  in DIMACS:
-14342 -14343  14344 -1056  14345 0
-14342 -14343  14344 -1056 -14346 0
-14342 -14343  14344 -1056  14347 0

c  -1+1 --> 0
c    ( b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0 ∧  p_1056) -> (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧ -b^{24, 45}_0)
c  in CNF:
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_2
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_1
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_0
c  in DIMACS:
-14342  14343 -14344 -1056 -14345 0
-14342  14343 -14344 -1056 -14346 0
-14342  14343 -14344 -1056 -14347 0

c  0+1 --> 1
c    (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧  p_1056) -> (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0)
c  in CNF:
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_2
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_1
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨  b^{24, 45}_0
c  in DIMACS:
 14342  14343  14344 -1056 -14345 0
 14342  14343  14344 -1056 -14346 0
 14342  14343  14344 -1056  14347 0

c  1+1 --> 2
c    (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0 ∧  p_1056) -> (-b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0)
c  in CNF:
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_2
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨  b^{24, 45}_1
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ -p_1056 ∨ -b^{24, 45}_0
c  in DIMACS:
 14342  14343 -14344 -1056 -14345 0
 14342  14343 -14344 -1056  14346 0
 14342  14343 -14344 -1056 -14347 0

c  2+1 --> break 
c    (-b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 14342 -14343  14344 -1056 1162 0


c  2-1 --> 1
c    (-b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧ -p_1056) -> (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0)
c  in CNF:
c     b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_2
c     b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_1
c     b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨  b^{24, 45}_0
c  in DIMACS:
 14342 -14343  14344  1056 -14345 0
 14342 -14343  14344  1056 -14346 0
 14342 -14343  14344  1056  14347 0

c  1-1 --> 0
c    (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0 ∧ -p_1056) -> (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧ -b^{24, 45}_0)
c  in CNF:
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_2
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_1
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_0
c  in DIMACS:
 14342  14343 -14344  1056 -14345 0
 14342  14343 -14344  1056 -14346 0
 14342  14343 -14344  1056 -14347 0

c  0-1 --> -1
c    (-b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧ -p_1056) -> ( b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0)
c  in CNF:
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨  b^{24, 45}_2
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_1
c     b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨  b^{24, 45}_0
c  in DIMACS:
 14342  14343  14344  1056  14345 0
 14342  14343  14344  1056 -14346 0
 14342  14343  14344  1056  14347 0

c  -1-1 --> -2
c    ( b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧  b^{24, 44}_0 ∧ -p_1056) -> ( b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0)
c  in CNF:
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨  b^{24, 45}_2
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨  b^{24, 45}_1
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨  p_1056 ∨ -b^{24, 45}_0
c  in DIMACS:
-14342  14343 -14344  1056  14345 0
-14342  14343 -14344  1056  14346 0
-14342  14343 -14344  1056 -14347 0

c  -2-1 --> break 
c    ( b^{24, 44}_2 ∧  b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨  b^{24, 44}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-14342 -14343  14344  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 44}_2 ∧ -b^{24, 44}_1 ∧ -b^{24, 44}_0 ∧ true) 
c  in CNF:
c    -b^{24, 44}_2 ∨  b^{24, 44}_1 ∨  b^{24, 44}_0 ∨ false 
c  in DIMACS:
-14342  14343  14344  0

c  3 does not represent an automaton state.
c    -(-b^{24, 44}_2 ∧  b^{24, 44}_1 ∧  b^{24, 44}_0 ∧ true) 
c  in CNF:
c     b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ false 
c  in DIMACS:
 14342 -14343 -14344  0
c  -3 does not represent an automaton state.
c    -( b^{24, 44}_2 ∧  b^{24, 44}_1 ∧  b^{24, 44}_0 ∧ true) 
c  in CNF:
c    -b^{24, 44}_2 ∨ -b^{24, 44}_1 ∨ -b^{24, 44}_0 ∨ false 
c  in DIMACS:
-14342 -14343 -14344  0

c i = 45
c  -2+1 --> -1
c    ( b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧  p_1080) -> ( b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0)
c  in CNF:
c    -b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨  b^{24, 46}_2
c    -b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_1
c    -b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨  b^{24, 46}_0
c  in DIMACS:
-14345 -14346  14347 -1080  14348 0
-14345 -14346  14347 -1080 -14349 0
-14345 -14346  14347 -1080  14350 0

c  -1+1 --> 0
c    ( b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0 ∧  p_1080) -> (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧ -b^{24, 46}_0)
c  in CNF:
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_2
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_1
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_0
c  in DIMACS:
-14345  14346 -14347 -1080 -14348 0
-14345  14346 -14347 -1080 -14349 0
-14345  14346 -14347 -1080 -14350 0

c  0+1 --> 1
c    (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧  p_1080) -> (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0)
c  in CNF:
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_2
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_1
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨  b^{24, 46}_0
c  in DIMACS:
 14345  14346  14347 -1080 -14348 0
 14345  14346  14347 -1080 -14349 0
 14345  14346  14347 -1080  14350 0

c  1+1 --> 2
c    (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0 ∧  p_1080) -> (-b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0)
c  in CNF:
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_2
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨  b^{24, 46}_1
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ -p_1080 ∨ -b^{24, 46}_0
c  in DIMACS:
 14345  14346 -14347 -1080 -14348 0
 14345  14346 -14347 -1080  14349 0
 14345  14346 -14347 -1080 -14350 0

c  2+1 --> break 
c    (-b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 14345 -14346  14347 -1080 1162 0


c  2-1 --> 1
c    (-b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧ -p_1080) -> (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0)
c  in CNF:
c     b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_2
c     b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_1
c     b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨  b^{24, 46}_0
c  in DIMACS:
 14345 -14346  14347  1080 -14348 0
 14345 -14346  14347  1080 -14349 0
 14345 -14346  14347  1080  14350 0

c  1-1 --> 0
c    (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0 ∧ -p_1080) -> (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧ -b^{24, 46}_0)
c  in CNF:
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_2
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_1
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_0
c  in DIMACS:
 14345  14346 -14347  1080 -14348 0
 14345  14346 -14347  1080 -14349 0
 14345  14346 -14347  1080 -14350 0

c  0-1 --> -1
c    (-b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧ -p_1080) -> ( b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0)
c  in CNF:
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨  b^{24, 46}_2
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_1
c     b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨  b^{24, 46}_0
c  in DIMACS:
 14345  14346  14347  1080  14348 0
 14345  14346  14347  1080 -14349 0
 14345  14346  14347  1080  14350 0

c  -1-1 --> -2
c    ( b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧  b^{24, 45}_0 ∧ -p_1080) -> ( b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0)
c  in CNF:
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨  b^{24, 46}_2
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨  b^{24, 46}_1
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨  p_1080 ∨ -b^{24, 46}_0
c  in DIMACS:
-14345  14346 -14347  1080  14348 0
-14345  14346 -14347  1080  14349 0
-14345  14346 -14347  1080 -14350 0

c  -2-1 --> break 
c    ( b^{24, 45}_2 ∧  b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨  b^{24, 45}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-14345 -14346  14347  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 45}_2 ∧ -b^{24, 45}_1 ∧ -b^{24, 45}_0 ∧ true) 
c  in CNF:
c    -b^{24, 45}_2 ∨  b^{24, 45}_1 ∨  b^{24, 45}_0 ∨ false 
c  in DIMACS:
-14345  14346  14347  0

c  3 does not represent an automaton state.
c    -(-b^{24, 45}_2 ∧  b^{24, 45}_1 ∧  b^{24, 45}_0 ∧ true) 
c  in CNF:
c     b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ false 
c  in DIMACS:
 14345 -14346 -14347  0
c  -3 does not represent an automaton state.
c    -( b^{24, 45}_2 ∧  b^{24, 45}_1 ∧  b^{24, 45}_0 ∧ true) 
c  in CNF:
c    -b^{24, 45}_2 ∨ -b^{24, 45}_1 ∨ -b^{24, 45}_0 ∨ false 
c  in DIMACS:
-14345 -14346 -14347  0

c i = 46
c  -2+1 --> -1
c    ( b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧  p_1104) -> ( b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0)
c  in CNF:
c    -b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨  b^{24, 47}_2
c    -b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_1
c    -b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨  b^{24, 47}_0
c  in DIMACS:
-14348 -14349  14350 -1104  14351 0
-14348 -14349  14350 -1104 -14352 0
-14348 -14349  14350 -1104  14353 0

c  -1+1 --> 0
c    ( b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0 ∧  p_1104) -> (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧ -b^{24, 47}_0)
c  in CNF:
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_2
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_1
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_0
c  in DIMACS:
-14348  14349 -14350 -1104 -14351 0
-14348  14349 -14350 -1104 -14352 0
-14348  14349 -14350 -1104 -14353 0

c  0+1 --> 1
c    (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧  p_1104) -> (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0)
c  in CNF:
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_2
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_1
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨  b^{24, 47}_0
c  in DIMACS:
 14348  14349  14350 -1104 -14351 0
 14348  14349  14350 -1104 -14352 0
 14348  14349  14350 -1104  14353 0

c  1+1 --> 2
c    (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0 ∧  p_1104) -> (-b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0)
c  in CNF:
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_2
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨  b^{24, 47}_1
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ -p_1104 ∨ -b^{24, 47}_0
c  in DIMACS:
 14348  14349 -14350 -1104 -14351 0
 14348  14349 -14350 -1104  14352 0
 14348  14349 -14350 -1104 -14353 0

c  2+1 --> break 
c    (-b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 14348 -14349  14350 -1104 1162 0


c  2-1 --> 1
c    (-b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧ -p_1104) -> (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0)
c  in CNF:
c     b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_2
c     b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_1
c     b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨  b^{24, 47}_0
c  in DIMACS:
 14348 -14349  14350  1104 -14351 0
 14348 -14349  14350  1104 -14352 0
 14348 -14349  14350  1104  14353 0

c  1-1 --> 0
c    (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0 ∧ -p_1104) -> (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧ -b^{24, 47}_0)
c  in CNF:
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_2
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_1
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_0
c  in DIMACS:
 14348  14349 -14350  1104 -14351 0
 14348  14349 -14350  1104 -14352 0
 14348  14349 -14350  1104 -14353 0

c  0-1 --> -1
c    (-b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧ -p_1104) -> ( b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0)
c  in CNF:
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨  b^{24, 47}_2
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_1
c     b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨  b^{24, 47}_0
c  in DIMACS:
 14348  14349  14350  1104  14351 0
 14348  14349  14350  1104 -14352 0
 14348  14349  14350  1104  14353 0

c  -1-1 --> -2
c    ( b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧  b^{24, 46}_0 ∧ -p_1104) -> ( b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0)
c  in CNF:
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨  b^{24, 47}_2
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨  b^{24, 47}_1
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨  p_1104 ∨ -b^{24, 47}_0
c  in DIMACS:
-14348  14349 -14350  1104  14351 0
-14348  14349 -14350  1104  14352 0
-14348  14349 -14350  1104 -14353 0

c  -2-1 --> break 
c    ( b^{24, 46}_2 ∧  b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨  b^{24, 46}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-14348 -14349  14350  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 46}_2 ∧ -b^{24, 46}_1 ∧ -b^{24, 46}_0 ∧ true) 
c  in CNF:
c    -b^{24, 46}_2 ∨  b^{24, 46}_1 ∨  b^{24, 46}_0 ∨ false 
c  in DIMACS:
-14348  14349  14350  0

c  3 does not represent an automaton state.
c    -(-b^{24, 46}_2 ∧  b^{24, 46}_1 ∧  b^{24, 46}_0 ∧ true) 
c  in CNF:
c     b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ false 
c  in DIMACS:
 14348 -14349 -14350  0
c  -3 does not represent an automaton state.
c    -( b^{24, 46}_2 ∧  b^{24, 46}_1 ∧  b^{24, 46}_0 ∧ true) 
c  in CNF:
c    -b^{24, 46}_2 ∨ -b^{24, 46}_1 ∨ -b^{24, 46}_0 ∨ false 
c  in DIMACS:
-14348 -14349 -14350  0

c i = 47
c  -2+1 --> -1
c    ( b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧  p_1128) -> ( b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0)
c  in CNF:
c    -b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨  b^{24, 48}_2
c    -b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_1
c    -b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨  b^{24, 48}_0
c  in DIMACS:
-14351 -14352  14353 -1128  14354 0
-14351 -14352  14353 -1128 -14355 0
-14351 -14352  14353 -1128  14356 0

c  -1+1 --> 0
c    ( b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0 ∧  p_1128) -> (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧ -b^{24, 48}_0)
c  in CNF:
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_2
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_1
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_0
c  in DIMACS:
-14351  14352 -14353 -1128 -14354 0
-14351  14352 -14353 -1128 -14355 0
-14351  14352 -14353 -1128 -14356 0

c  0+1 --> 1
c    (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧  p_1128) -> (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0)
c  in CNF:
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_2
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_1
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨  b^{24, 48}_0
c  in DIMACS:
 14351  14352  14353 -1128 -14354 0
 14351  14352  14353 -1128 -14355 0
 14351  14352  14353 -1128  14356 0

c  1+1 --> 2
c    (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0 ∧  p_1128) -> (-b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0)
c  in CNF:
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_2
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨  b^{24, 48}_1
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ -p_1128 ∨ -b^{24, 48}_0
c  in DIMACS:
 14351  14352 -14353 -1128 -14354 0
 14351  14352 -14353 -1128  14355 0
 14351  14352 -14353 -1128 -14356 0

c  2+1 --> break 
c    (-b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 14351 -14352  14353 -1128 1162 0


c  2-1 --> 1
c    (-b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧ -p_1128) -> (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0)
c  in CNF:
c     b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_2
c     b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_1
c     b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨  b^{24, 48}_0
c  in DIMACS:
 14351 -14352  14353  1128 -14354 0
 14351 -14352  14353  1128 -14355 0
 14351 -14352  14353  1128  14356 0

c  1-1 --> 0
c    (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0 ∧ -p_1128) -> (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧ -b^{24, 48}_0)
c  in CNF:
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_2
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_1
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_0
c  in DIMACS:
 14351  14352 -14353  1128 -14354 0
 14351  14352 -14353  1128 -14355 0
 14351  14352 -14353  1128 -14356 0

c  0-1 --> -1
c    (-b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧ -p_1128) -> ( b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0)
c  in CNF:
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨  b^{24, 48}_2
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_1
c     b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨  b^{24, 48}_0
c  in DIMACS:
 14351  14352  14353  1128  14354 0
 14351  14352  14353  1128 -14355 0
 14351  14352  14353  1128  14356 0

c  -1-1 --> -2
c    ( b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧  b^{24, 47}_0 ∧ -p_1128) -> ( b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0)
c  in CNF:
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨  b^{24, 48}_2
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨  b^{24, 48}_1
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨  p_1128 ∨ -b^{24, 48}_0
c  in DIMACS:
-14351  14352 -14353  1128  14354 0
-14351  14352 -14353  1128  14355 0
-14351  14352 -14353  1128 -14356 0

c  -2-1 --> break 
c    ( b^{24, 47}_2 ∧  b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨  b^{24, 47}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-14351 -14352  14353  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 47}_2 ∧ -b^{24, 47}_1 ∧ -b^{24, 47}_0 ∧ true) 
c  in CNF:
c    -b^{24, 47}_2 ∨  b^{24, 47}_1 ∨  b^{24, 47}_0 ∨ false 
c  in DIMACS:
-14351  14352  14353  0

c  3 does not represent an automaton state.
c    -(-b^{24, 47}_2 ∧  b^{24, 47}_1 ∧  b^{24, 47}_0 ∧ true) 
c  in CNF:
c     b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ false 
c  in DIMACS:
 14351 -14352 -14353  0
c  -3 does not represent an automaton state.
c    -( b^{24, 47}_2 ∧  b^{24, 47}_1 ∧  b^{24, 47}_0 ∧ true) 
c  in CNF:
c    -b^{24, 47}_2 ∨ -b^{24, 47}_1 ∨ -b^{24, 47}_0 ∨ false 
c  in DIMACS:
-14351 -14352 -14353  0

c i = 48
c  -2+1 --> -1
c    ( b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧  p_1152) -> ( b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧  b^{24, 49}_0)
c  in CNF:
c    -b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨  b^{24, 49}_2
c    -b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_1
c    -b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨  b^{24, 49}_0
c  in DIMACS:
-14354 -14355  14356 -1152  14357 0
-14354 -14355  14356 -1152 -14358 0
-14354 -14355  14356 -1152  14359 0

c  -1+1 --> 0
c    ( b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0 ∧  p_1152) -> (-b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧ -b^{24, 49}_0)
c  in CNF:
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_2
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_1
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_0
c  in DIMACS:
-14354  14355 -14356 -1152 -14357 0
-14354  14355 -14356 -1152 -14358 0
-14354  14355 -14356 -1152 -14359 0

c  0+1 --> 1
c    (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧  p_1152) -> (-b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧  b^{24, 49}_0)
c  in CNF:
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_2
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_1
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨  b^{24, 49}_0
c  in DIMACS:
 14354  14355  14356 -1152 -14357 0
 14354  14355  14356 -1152 -14358 0
 14354  14355  14356 -1152  14359 0

c  1+1 --> 2
c    (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0 ∧  p_1152) -> (-b^{24, 49}_2 ∧  b^{24, 49}_1 ∧ -b^{24, 49}_0)
c  in CNF:
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_2
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨  b^{24, 49}_1
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ -p_1152 ∨ -b^{24, 49}_0
c  in DIMACS:
 14354  14355 -14356 -1152 -14357 0
 14354  14355 -14356 -1152  14358 0
 14354  14355 -14356 -1152 -14359 0

c  2+1 --> break 
c    (-b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 14354 -14355  14356 -1152 1162 0


c  2-1 --> 1
c    (-b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧ -p_1152) -> (-b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧  b^{24, 49}_0)
c  in CNF:
c     b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_2
c     b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_1
c     b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨  b^{24, 49}_0
c  in DIMACS:
 14354 -14355  14356  1152 -14357 0
 14354 -14355  14356  1152 -14358 0
 14354 -14355  14356  1152  14359 0

c  1-1 --> 0
c    (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0 ∧ -p_1152) -> (-b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧ -b^{24, 49}_0)
c  in CNF:
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_2
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_1
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_0
c  in DIMACS:
 14354  14355 -14356  1152 -14357 0
 14354  14355 -14356  1152 -14358 0
 14354  14355 -14356  1152 -14359 0

c  0-1 --> -1
c    (-b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧ -p_1152) -> ( b^{24, 49}_2 ∧ -b^{24, 49}_1 ∧  b^{24, 49}_0)
c  in CNF:
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨  b^{24, 49}_2
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_1
c     b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨  b^{24, 49}_0
c  in DIMACS:
 14354  14355  14356  1152  14357 0
 14354  14355  14356  1152 -14358 0
 14354  14355  14356  1152  14359 0

c  -1-1 --> -2
c    ( b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧  b^{24, 48}_0 ∧ -p_1152) -> ( b^{24, 49}_2 ∧  b^{24, 49}_1 ∧ -b^{24, 49}_0)
c  in CNF:
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨  b^{24, 49}_2
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨  b^{24, 49}_1
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨  p_1152 ∨ -b^{24, 49}_0
c  in DIMACS:
-14354  14355 -14356  1152  14357 0
-14354  14355 -14356  1152  14358 0
-14354  14355 -14356  1152 -14359 0

c  -2-1 --> break 
c    ( b^{24, 48}_2 ∧  b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨  b^{24, 48}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-14354 -14355  14356  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{24, 48}_2 ∧ -b^{24, 48}_1 ∧ -b^{24, 48}_0 ∧ true) 
c  in CNF:
c    -b^{24, 48}_2 ∨  b^{24, 48}_1 ∨  b^{24, 48}_0 ∨ false 
c  in DIMACS:
-14354  14355  14356  0

c  3 does not represent an automaton state.
c    -(-b^{24, 48}_2 ∧  b^{24, 48}_1 ∧  b^{24, 48}_0 ∧ true) 
c  in CNF:
c     b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ false 
c  in DIMACS:
 14354 -14355 -14356  0
c  -3 does not represent an automaton state.
c    -( b^{24, 48}_2 ∧  b^{24, 48}_1 ∧  b^{24, 48}_0 ∧ true) 
c  in CNF:
c    -b^{24, 48}_2 ∨ -b^{24, 48}_1 ∨ -b^{24, 48}_0 ∨ false 
c  in DIMACS:
-14354 -14355 -14356  0

c INIT for k = 25
c    -b^{25, 1}_2
c    -b^{25, 1}_1
c    -b^{25, 1}_0
c  in DIMACS:
-14360 0
-14361 0
-14362 0

c Transitions for k = 25
c i = 1
c  -2+1 --> -1
c    ( b^{25, 1}_2 ∧  b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧  p_25) -> ( b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0)
c  in CNF:
c    -b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨  b^{25, 2}_2
c    -b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_1
c    -b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨  b^{25, 2}_0
c  in DIMACS:
-14360 -14361  14362 -25  14363 0
-14360 -14361  14362 -25 -14364 0
-14360 -14361  14362 -25  14365 0

c  -1+1 --> 0
c    ( b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧  b^{25, 1}_0 ∧  p_25) -> (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧ -b^{25, 2}_0)
c  in CNF:
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_2
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_1
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_0
c  in DIMACS:
-14360  14361 -14362 -25 -14363 0
-14360  14361 -14362 -25 -14364 0
-14360  14361 -14362 -25 -14365 0

c  0+1 --> 1
c    (-b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧  p_25) -> (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0)
c  in CNF:
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_2
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_1
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨  b^{25, 2}_0
c  in DIMACS:
 14360  14361  14362 -25 -14363 0
 14360  14361  14362 -25 -14364 0
 14360  14361  14362 -25  14365 0

c  1+1 --> 2
c    (-b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧  b^{25, 1}_0 ∧  p_25) -> (-b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0)
c  in CNF:
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_2
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨  b^{25, 2}_1
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ -p_25 ∨ -b^{25, 2}_0
c  in DIMACS:
 14360  14361 -14362 -25 -14363 0
 14360  14361 -14362 -25  14364 0
 14360  14361 -14362 -25 -14365 0

c  2+1 --> break 
c    (-b^{25, 1}_2 ∧  b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧  p_25) -> break
c  in CNF:
c     b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ -p_25 ∨ break
c  in DIMACS:
 14360 -14361  14362 -25 1162 0


c  2-1 --> 1
c    (-b^{25, 1}_2 ∧  b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧ -p_25) -> (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0)
c  in CNF:
c     b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_2
c     b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_1
c     b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨  b^{25, 2}_0
c  in DIMACS:
 14360 -14361  14362  25 -14363 0
 14360 -14361  14362  25 -14364 0
 14360 -14361  14362  25  14365 0

c  1-1 --> 0
c    (-b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧  b^{25, 1}_0 ∧ -p_25) -> (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧ -b^{25, 2}_0)
c  in CNF:
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_2
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_1
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_0
c  in DIMACS:
 14360  14361 -14362  25 -14363 0
 14360  14361 -14362  25 -14364 0
 14360  14361 -14362  25 -14365 0

c  0-1 --> -1
c    (-b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧ -p_25) -> ( b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0)
c  in CNF:
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨  b^{25, 2}_2
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_1
c     b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨  b^{25, 2}_0
c  in DIMACS:
 14360  14361  14362  25  14363 0
 14360  14361  14362  25 -14364 0
 14360  14361  14362  25  14365 0

c  -1-1 --> -2
c    ( b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧  b^{25, 1}_0 ∧ -p_25) -> ( b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0)
c  in CNF:
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨  b^{25, 2}_2
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨  b^{25, 2}_1
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨  p_25 ∨ -b^{25, 2}_0
c  in DIMACS:
-14360  14361 -14362  25  14363 0
-14360  14361 -14362  25  14364 0
-14360  14361 -14362  25 -14365 0

c  -2-1 --> break 
c    ( b^{25, 1}_2 ∧  b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧ -p_25) -> break
c  in CNF:
c    -b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨  b^{25, 1}_0 ∨  p_25 ∨ break
c  in DIMACS:
-14360 -14361  14362  25 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 1}_2 ∧ -b^{25, 1}_1 ∧ -b^{25, 1}_0 ∧ true) 
c  in CNF:
c    -b^{25, 1}_2 ∨  b^{25, 1}_1 ∨  b^{25, 1}_0 ∨ false 
c  in DIMACS:
-14360  14361  14362  0

c  3 does not represent an automaton state.
c    -(-b^{25, 1}_2 ∧  b^{25, 1}_1 ∧  b^{25, 1}_0 ∧ true) 
c  in CNF:
c     b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ false 
c  in DIMACS:
 14360 -14361 -14362  0
c  -3 does not represent an automaton state.
c    -( b^{25, 1}_2 ∧  b^{25, 1}_1 ∧  b^{25, 1}_0 ∧ true) 
c  in CNF:
c    -b^{25, 1}_2 ∨ -b^{25, 1}_1 ∨ -b^{25, 1}_0 ∨ false 
c  in DIMACS:
-14360 -14361 -14362  0

c i = 2
c  -2+1 --> -1
c    ( b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧  p_50) -> ( b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0)
c  in CNF:
c    -b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨  b^{25, 3}_2
c    -b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_1
c    -b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨  b^{25, 3}_0
c  in DIMACS:
-14363 -14364  14365 -50  14366 0
-14363 -14364  14365 -50 -14367 0
-14363 -14364  14365 -50  14368 0

c  -1+1 --> 0
c    ( b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0 ∧  p_50) -> (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧ -b^{25, 3}_0)
c  in CNF:
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_2
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_1
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_0
c  in DIMACS:
-14363  14364 -14365 -50 -14366 0
-14363  14364 -14365 -50 -14367 0
-14363  14364 -14365 -50 -14368 0

c  0+1 --> 1
c    (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧  p_50) -> (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0)
c  in CNF:
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_2
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_1
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨  b^{25, 3}_0
c  in DIMACS:
 14363  14364  14365 -50 -14366 0
 14363  14364  14365 -50 -14367 0
 14363  14364  14365 -50  14368 0

c  1+1 --> 2
c    (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0 ∧  p_50) -> (-b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0)
c  in CNF:
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_2
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨  b^{25, 3}_1
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ -p_50 ∨ -b^{25, 3}_0
c  in DIMACS:
 14363  14364 -14365 -50 -14366 0
 14363  14364 -14365 -50  14367 0
 14363  14364 -14365 -50 -14368 0

c  2+1 --> break 
c    (-b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧  p_50) -> break
c  in CNF:
c     b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 14363 -14364  14365 -50 1162 0


c  2-1 --> 1
c    (-b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧ -p_50) -> (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0)
c  in CNF:
c     b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_2
c     b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_1
c     b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨  b^{25, 3}_0
c  in DIMACS:
 14363 -14364  14365  50 -14366 0
 14363 -14364  14365  50 -14367 0
 14363 -14364  14365  50  14368 0

c  1-1 --> 0
c    (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0 ∧ -p_50) -> (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧ -b^{25, 3}_0)
c  in CNF:
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_2
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_1
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_0
c  in DIMACS:
 14363  14364 -14365  50 -14366 0
 14363  14364 -14365  50 -14367 0
 14363  14364 -14365  50 -14368 0

c  0-1 --> -1
c    (-b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧ -p_50) -> ( b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0)
c  in CNF:
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨  b^{25, 3}_2
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_1
c     b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨  b^{25, 3}_0
c  in DIMACS:
 14363  14364  14365  50  14366 0
 14363  14364  14365  50 -14367 0
 14363  14364  14365  50  14368 0

c  -1-1 --> -2
c    ( b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧  b^{25, 2}_0 ∧ -p_50) -> ( b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0)
c  in CNF:
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨  b^{25, 3}_2
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨  b^{25, 3}_1
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨  p_50 ∨ -b^{25, 3}_0
c  in DIMACS:
-14363  14364 -14365  50  14366 0
-14363  14364 -14365  50  14367 0
-14363  14364 -14365  50 -14368 0

c  -2-1 --> break 
c    ( b^{25, 2}_2 ∧  b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨  b^{25, 2}_0 ∨  p_50 ∨ break
c  in DIMACS:
-14363 -14364  14365  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 2}_2 ∧ -b^{25, 2}_1 ∧ -b^{25, 2}_0 ∧ true) 
c  in CNF:
c    -b^{25, 2}_2 ∨  b^{25, 2}_1 ∨  b^{25, 2}_0 ∨ false 
c  in DIMACS:
-14363  14364  14365  0

c  3 does not represent an automaton state.
c    -(-b^{25, 2}_2 ∧  b^{25, 2}_1 ∧  b^{25, 2}_0 ∧ true) 
c  in CNF:
c     b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ false 
c  in DIMACS:
 14363 -14364 -14365  0
c  -3 does not represent an automaton state.
c    -( b^{25, 2}_2 ∧  b^{25, 2}_1 ∧  b^{25, 2}_0 ∧ true) 
c  in CNF:
c    -b^{25, 2}_2 ∨ -b^{25, 2}_1 ∨ -b^{25, 2}_0 ∨ false 
c  in DIMACS:
-14363 -14364 -14365  0

c i = 3
c  -2+1 --> -1
c    ( b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧  p_75) -> ( b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0)
c  in CNF:
c    -b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨  b^{25, 4}_2
c    -b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_1
c    -b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨  b^{25, 4}_0
c  in DIMACS:
-14366 -14367  14368 -75  14369 0
-14366 -14367  14368 -75 -14370 0
-14366 -14367  14368 -75  14371 0

c  -1+1 --> 0
c    ( b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0 ∧  p_75) -> (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧ -b^{25, 4}_0)
c  in CNF:
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_2
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_1
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_0
c  in DIMACS:
-14366  14367 -14368 -75 -14369 0
-14366  14367 -14368 -75 -14370 0
-14366  14367 -14368 -75 -14371 0

c  0+1 --> 1
c    (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧  p_75) -> (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0)
c  in CNF:
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_2
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_1
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨  b^{25, 4}_0
c  in DIMACS:
 14366  14367  14368 -75 -14369 0
 14366  14367  14368 -75 -14370 0
 14366  14367  14368 -75  14371 0

c  1+1 --> 2
c    (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0 ∧  p_75) -> (-b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0)
c  in CNF:
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_2
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨  b^{25, 4}_1
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ -p_75 ∨ -b^{25, 4}_0
c  in DIMACS:
 14366  14367 -14368 -75 -14369 0
 14366  14367 -14368 -75  14370 0
 14366  14367 -14368 -75 -14371 0

c  2+1 --> break 
c    (-b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧  p_75) -> break
c  in CNF:
c     b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 14366 -14367  14368 -75 1162 0


c  2-1 --> 1
c    (-b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧ -p_75) -> (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0)
c  in CNF:
c     b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_2
c     b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_1
c     b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨  b^{25, 4}_0
c  in DIMACS:
 14366 -14367  14368  75 -14369 0
 14366 -14367  14368  75 -14370 0
 14366 -14367  14368  75  14371 0

c  1-1 --> 0
c    (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0 ∧ -p_75) -> (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧ -b^{25, 4}_0)
c  in CNF:
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_2
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_1
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_0
c  in DIMACS:
 14366  14367 -14368  75 -14369 0
 14366  14367 -14368  75 -14370 0
 14366  14367 -14368  75 -14371 0

c  0-1 --> -1
c    (-b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧ -p_75) -> ( b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0)
c  in CNF:
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨  b^{25, 4}_2
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_1
c     b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨  b^{25, 4}_0
c  in DIMACS:
 14366  14367  14368  75  14369 0
 14366  14367  14368  75 -14370 0
 14366  14367  14368  75  14371 0

c  -1-1 --> -2
c    ( b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧  b^{25, 3}_0 ∧ -p_75) -> ( b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0)
c  in CNF:
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨  b^{25, 4}_2
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨  b^{25, 4}_1
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨  p_75 ∨ -b^{25, 4}_0
c  in DIMACS:
-14366  14367 -14368  75  14369 0
-14366  14367 -14368  75  14370 0
-14366  14367 -14368  75 -14371 0

c  -2-1 --> break 
c    ( b^{25, 3}_2 ∧  b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨  b^{25, 3}_0 ∨  p_75 ∨ break
c  in DIMACS:
-14366 -14367  14368  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 3}_2 ∧ -b^{25, 3}_1 ∧ -b^{25, 3}_0 ∧ true) 
c  in CNF:
c    -b^{25, 3}_2 ∨  b^{25, 3}_1 ∨  b^{25, 3}_0 ∨ false 
c  in DIMACS:
-14366  14367  14368  0

c  3 does not represent an automaton state.
c    -(-b^{25, 3}_2 ∧  b^{25, 3}_1 ∧  b^{25, 3}_0 ∧ true) 
c  in CNF:
c     b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ false 
c  in DIMACS:
 14366 -14367 -14368  0
c  -3 does not represent an automaton state.
c    -( b^{25, 3}_2 ∧  b^{25, 3}_1 ∧  b^{25, 3}_0 ∧ true) 
c  in CNF:
c    -b^{25, 3}_2 ∨ -b^{25, 3}_1 ∨ -b^{25, 3}_0 ∨ false 
c  in DIMACS:
-14366 -14367 -14368  0

c i = 4
c  -2+1 --> -1
c    ( b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧  p_100) -> ( b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0)
c  in CNF:
c    -b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨  b^{25, 5}_2
c    -b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_1
c    -b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨  b^{25, 5}_0
c  in DIMACS:
-14369 -14370  14371 -100  14372 0
-14369 -14370  14371 -100 -14373 0
-14369 -14370  14371 -100  14374 0

c  -1+1 --> 0
c    ( b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0 ∧  p_100) -> (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧ -b^{25, 5}_0)
c  in CNF:
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_2
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_1
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_0
c  in DIMACS:
-14369  14370 -14371 -100 -14372 0
-14369  14370 -14371 -100 -14373 0
-14369  14370 -14371 -100 -14374 0

c  0+1 --> 1
c    (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧  p_100) -> (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0)
c  in CNF:
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_2
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_1
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨  b^{25, 5}_0
c  in DIMACS:
 14369  14370  14371 -100 -14372 0
 14369  14370  14371 -100 -14373 0
 14369  14370  14371 -100  14374 0

c  1+1 --> 2
c    (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0 ∧  p_100) -> (-b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0)
c  in CNF:
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_2
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨  b^{25, 5}_1
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ -p_100 ∨ -b^{25, 5}_0
c  in DIMACS:
 14369  14370 -14371 -100 -14372 0
 14369  14370 -14371 -100  14373 0
 14369  14370 -14371 -100 -14374 0

c  2+1 --> break 
c    (-b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧  p_100) -> break
c  in CNF:
c     b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 14369 -14370  14371 -100 1162 0


c  2-1 --> 1
c    (-b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧ -p_100) -> (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0)
c  in CNF:
c     b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_2
c     b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_1
c     b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨  b^{25, 5}_0
c  in DIMACS:
 14369 -14370  14371  100 -14372 0
 14369 -14370  14371  100 -14373 0
 14369 -14370  14371  100  14374 0

c  1-1 --> 0
c    (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0 ∧ -p_100) -> (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧ -b^{25, 5}_0)
c  in CNF:
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_2
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_1
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_0
c  in DIMACS:
 14369  14370 -14371  100 -14372 0
 14369  14370 -14371  100 -14373 0
 14369  14370 -14371  100 -14374 0

c  0-1 --> -1
c    (-b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧ -p_100) -> ( b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0)
c  in CNF:
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨  b^{25, 5}_2
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_1
c     b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨  b^{25, 5}_0
c  in DIMACS:
 14369  14370  14371  100  14372 0
 14369  14370  14371  100 -14373 0
 14369  14370  14371  100  14374 0

c  -1-1 --> -2
c    ( b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧  b^{25, 4}_0 ∧ -p_100) -> ( b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0)
c  in CNF:
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨  b^{25, 5}_2
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨  b^{25, 5}_1
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨  p_100 ∨ -b^{25, 5}_0
c  in DIMACS:
-14369  14370 -14371  100  14372 0
-14369  14370 -14371  100  14373 0
-14369  14370 -14371  100 -14374 0

c  -2-1 --> break 
c    ( b^{25, 4}_2 ∧  b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨  b^{25, 4}_0 ∨  p_100 ∨ break
c  in DIMACS:
-14369 -14370  14371  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 4}_2 ∧ -b^{25, 4}_1 ∧ -b^{25, 4}_0 ∧ true) 
c  in CNF:
c    -b^{25, 4}_2 ∨  b^{25, 4}_1 ∨  b^{25, 4}_0 ∨ false 
c  in DIMACS:
-14369  14370  14371  0

c  3 does not represent an automaton state.
c    -(-b^{25, 4}_2 ∧  b^{25, 4}_1 ∧  b^{25, 4}_0 ∧ true) 
c  in CNF:
c     b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ false 
c  in DIMACS:
 14369 -14370 -14371  0
c  -3 does not represent an automaton state.
c    -( b^{25, 4}_2 ∧  b^{25, 4}_1 ∧  b^{25, 4}_0 ∧ true) 
c  in CNF:
c    -b^{25, 4}_2 ∨ -b^{25, 4}_1 ∨ -b^{25, 4}_0 ∨ false 
c  in DIMACS:
-14369 -14370 -14371  0

c i = 5
c  -2+1 --> -1
c    ( b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧  p_125) -> ( b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0)
c  in CNF:
c    -b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨  b^{25, 6}_2
c    -b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_1
c    -b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨  b^{25, 6}_0
c  in DIMACS:
-14372 -14373  14374 -125  14375 0
-14372 -14373  14374 -125 -14376 0
-14372 -14373  14374 -125  14377 0

c  -1+1 --> 0
c    ( b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0 ∧  p_125) -> (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧ -b^{25, 6}_0)
c  in CNF:
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_2
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_1
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_0
c  in DIMACS:
-14372  14373 -14374 -125 -14375 0
-14372  14373 -14374 -125 -14376 0
-14372  14373 -14374 -125 -14377 0

c  0+1 --> 1
c    (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧  p_125) -> (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0)
c  in CNF:
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_2
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_1
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨  b^{25, 6}_0
c  in DIMACS:
 14372  14373  14374 -125 -14375 0
 14372  14373  14374 -125 -14376 0
 14372  14373  14374 -125  14377 0

c  1+1 --> 2
c    (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0 ∧  p_125) -> (-b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0)
c  in CNF:
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_2
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨  b^{25, 6}_1
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ -p_125 ∨ -b^{25, 6}_0
c  in DIMACS:
 14372  14373 -14374 -125 -14375 0
 14372  14373 -14374 -125  14376 0
 14372  14373 -14374 -125 -14377 0

c  2+1 --> break 
c    (-b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧  p_125) -> break
c  in CNF:
c     b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ -p_125 ∨ break
c  in DIMACS:
 14372 -14373  14374 -125 1162 0


c  2-1 --> 1
c    (-b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧ -p_125) -> (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0)
c  in CNF:
c     b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_2
c     b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_1
c     b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨  b^{25, 6}_0
c  in DIMACS:
 14372 -14373  14374  125 -14375 0
 14372 -14373  14374  125 -14376 0
 14372 -14373  14374  125  14377 0

c  1-1 --> 0
c    (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0 ∧ -p_125) -> (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧ -b^{25, 6}_0)
c  in CNF:
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_2
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_1
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_0
c  in DIMACS:
 14372  14373 -14374  125 -14375 0
 14372  14373 -14374  125 -14376 0
 14372  14373 -14374  125 -14377 0

c  0-1 --> -1
c    (-b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧ -p_125) -> ( b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0)
c  in CNF:
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨  b^{25, 6}_2
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_1
c     b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨  b^{25, 6}_0
c  in DIMACS:
 14372  14373  14374  125  14375 0
 14372  14373  14374  125 -14376 0
 14372  14373  14374  125  14377 0

c  -1-1 --> -2
c    ( b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧  b^{25, 5}_0 ∧ -p_125) -> ( b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0)
c  in CNF:
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨  b^{25, 6}_2
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨  b^{25, 6}_1
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨  p_125 ∨ -b^{25, 6}_0
c  in DIMACS:
-14372  14373 -14374  125  14375 0
-14372  14373 -14374  125  14376 0
-14372  14373 -14374  125 -14377 0

c  -2-1 --> break 
c    ( b^{25, 5}_2 ∧  b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧ -p_125) -> break
c  in CNF:
c    -b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨  b^{25, 5}_0 ∨  p_125 ∨ break
c  in DIMACS:
-14372 -14373  14374  125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 5}_2 ∧ -b^{25, 5}_1 ∧ -b^{25, 5}_0 ∧ true) 
c  in CNF:
c    -b^{25, 5}_2 ∨  b^{25, 5}_1 ∨  b^{25, 5}_0 ∨ false 
c  in DIMACS:
-14372  14373  14374  0

c  3 does not represent an automaton state.
c    -(-b^{25, 5}_2 ∧  b^{25, 5}_1 ∧  b^{25, 5}_0 ∧ true) 
c  in CNF:
c     b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ false 
c  in DIMACS:
 14372 -14373 -14374  0
c  -3 does not represent an automaton state.
c    -( b^{25, 5}_2 ∧  b^{25, 5}_1 ∧  b^{25, 5}_0 ∧ true) 
c  in CNF:
c    -b^{25, 5}_2 ∨ -b^{25, 5}_1 ∨ -b^{25, 5}_0 ∨ false 
c  in DIMACS:
-14372 -14373 -14374  0

c i = 6
c  -2+1 --> -1
c    ( b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧  p_150) -> ( b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0)
c  in CNF:
c    -b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨  b^{25, 7}_2
c    -b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_1
c    -b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨  b^{25, 7}_0
c  in DIMACS:
-14375 -14376  14377 -150  14378 0
-14375 -14376  14377 -150 -14379 0
-14375 -14376  14377 -150  14380 0

c  -1+1 --> 0
c    ( b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0 ∧  p_150) -> (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧ -b^{25, 7}_0)
c  in CNF:
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_2
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_1
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_0
c  in DIMACS:
-14375  14376 -14377 -150 -14378 0
-14375  14376 -14377 -150 -14379 0
-14375  14376 -14377 -150 -14380 0

c  0+1 --> 1
c    (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧  p_150) -> (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0)
c  in CNF:
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_2
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_1
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨  b^{25, 7}_0
c  in DIMACS:
 14375  14376  14377 -150 -14378 0
 14375  14376  14377 -150 -14379 0
 14375  14376  14377 -150  14380 0

c  1+1 --> 2
c    (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0 ∧  p_150) -> (-b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0)
c  in CNF:
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_2
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨  b^{25, 7}_1
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ -p_150 ∨ -b^{25, 7}_0
c  in DIMACS:
 14375  14376 -14377 -150 -14378 0
 14375  14376 -14377 -150  14379 0
 14375  14376 -14377 -150 -14380 0

c  2+1 --> break 
c    (-b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧  p_150) -> break
c  in CNF:
c     b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 14375 -14376  14377 -150 1162 0


c  2-1 --> 1
c    (-b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧ -p_150) -> (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0)
c  in CNF:
c     b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_2
c     b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_1
c     b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨  b^{25, 7}_0
c  in DIMACS:
 14375 -14376  14377  150 -14378 0
 14375 -14376  14377  150 -14379 0
 14375 -14376  14377  150  14380 0

c  1-1 --> 0
c    (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0 ∧ -p_150) -> (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧ -b^{25, 7}_0)
c  in CNF:
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_2
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_1
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_0
c  in DIMACS:
 14375  14376 -14377  150 -14378 0
 14375  14376 -14377  150 -14379 0
 14375  14376 -14377  150 -14380 0

c  0-1 --> -1
c    (-b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧ -p_150) -> ( b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0)
c  in CNF:
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨  b^{25, 7}_2
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_1
c     b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨  b^{25, 7}_0
c  in DIMACS:
 14375  14376  14377  150  14378 0
 14375  14376  14377  150 -14379 0
 14375  14376  14377  150  14380 0

c  -1-1 --> -2
c    ( b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧  b^{25, 6}_0 ∧ -p_150) -> ( b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0)
c  in CNF:
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨  b^{25, 7}_2
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨  b^{25, 7}_1
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨  p_150 ∨ -b^{25, 7}_0
c  in DIMACS:
-14375  14376 -14377  150  14378 0
-14375  14376 -14377  150  14379 0
-14375  14376 -14377  150 -14380 0

c  -2-1 --> break 
c    ( b^{25, 6}_2 ∧  b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨  b^{25, 6}_0 ∨  p_150 ∨ break
c  in DIMACS:
-14375 -14376  14377  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 6}_2 ∧ -b^{25, 6}_1 ∧ -b^{25, 6}_0 ∧ true) 
c  in CNF:
c    -b^{25, 6}_2 ∨  b^{25, 6}_1 ∨  b^{25, 6}_0 ∨ false 
c  in DIMACS:
-14375  14376  14377  0

c  3 does not represent an automaton state.
c    -(-b^{25, 6}_2 ∧  b^{25, 6}_1 ∧  b^{25, 6}_0 ∧ true) 
c  in CNF:
c     b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ false 
c  in DIMACS:
 14375 -14376 -14377  0
c  -3 does not represent an automaton state.
c    -( b^{25, 6}_2 ∧  b^{25, 6}_1 ∧  b^{25, 6}_0 ∧ true) 
c  in CNF:
c    -b^{25, 6}_2 ∨ -b^{25, 6}_1 ∨ -b^{25, 6}_0 ∨ false 
c  in DIMACS:
-14375 -14376 -14377  0

c i = 7
c  -2+1 --> -1
c    ( b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧  p_175) -> ( b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0)
c  in CNF:
c    -b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨  b^{25, 8}_2
c    -b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_1
c    -b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨  b^{25, 8}_0
c  in DIMACS:
-14378 -14379  14380 -175  14381 0
-14378 -14379  14380 -175 -14382 0
-14378 -14379  14380 -175  14383 0

c  -1+1 --> 0
c    ( b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0 ∧  p_175) -> (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧ -b^{25, 8}_0)
c  in CNF:
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_2
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_1
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_0
c  in DIMACS:
-14378  14379 -14380 -175 -14381 0
-14378  14379 -14380 -175 -14382 0
-14378  14379 -14380 -175 -14383 0

c  0+1 --> 1
c    (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧  p_175) -> (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0)
c  in CNF:
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_2
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_1
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨  b^{25, 8}_0
c  in DIMACS:
 14378  14379  14380 -175 -14381 0
 14378  14379  14380 -175 -14382 0
 14378  14379  14380 -175  14383 0

c  1+1 --> 2
c    (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0 ∧  p_175) -> (-b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0)
c  in CNF:
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_2
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨  b^{25, 8}_1
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ -p_175 ∨ -b^{25, 8}_0
c  in DIMACS:
 14378  14379 -14380 -175 -14381 0
 14378  14379 -14380 -175  14382 0
 14378  14379 -14380 -175 -14383 0

c  2+1 --> break 
c    (-b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧  p_175) -> break
c  in CNF:
c     b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 14378 -14379  14380 -175 1162 0


c  2-1 --> 1
c    (-b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧ -p_175) -> (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0)
c  in CNF:
c     b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_2
c     b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_1
c     b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨  b^{25, 8}_0
c  in DIMACS:
 14378 -14379  14380  175 -14381 0
 14378 -14379  14380  175 -14382 0
 14378 -14379  14380  175  14383 0

c  1-1 --> 0
c    (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0 ∧ -p_175) -> (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧ -b^{25, 8}_0)
c  in CNF:
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_2
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_1
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_0
c  in DIMACS:
 14378  14379 -14380  175 -14381 0
 14378  14379 -14380  175 -14382 0
 14378  14379 -14380  175 -14383 0

c  0-1 --> -1
c    (-b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧ -p_175) -> ( b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0)
c  in CNF:
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨  b^{25, 8}_2
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_1
c     b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨  b^{25, 8}_0
c  in DIMACS:
 14378  14379  14380  175  14381 0
 14378  14379  14380  175 -14382 0
 14378  14379  14380  175  14383 0

c  -1-1 --> -2
c    ( b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧  b^{25, 7}_0 ∧ -p_175) -> ( b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0)
c  in CNF:
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨  b^{25, 8}_2
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨  b^{25, 8}_1
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨  p_175 ∨ -b^{25, 8}_0
c  in DIMACS:
-14378  14379 -14380  175  14381 0
-14378  14379 -14380  175  14382 0
-14378  14379 -14380  175 -14383 0

c  -2-1 --> break 
c    ( b^{25, 7}_2 ∧  b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨  b^{25, 7}_0 ∨  p_175 ∨ break
c  in DIMACS:
-14378 -14379  14380  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 7}_2 ∧ -b^{25, 7}_1 ∧ -b^{25, 7}_0 ∧ true) 
c  in CNF:
c    -b^{25, 7}_2 ∨  b^{25, 7}_1 ∨  b^{25, 7}_0 ∨ false 
c  in DIMACS:
-14378  14379  14380  0

c  3 does not represent an automaton state.
c    -(-b^{25, 7}_2 ∧  b^{25, 7}_1 ∧  b^{25, 7}_0 ∧ true) 
c  in CNF:
c     b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ false 
c  in DIMACS:
 14378 -14379 -14380  0
c  -3 does not represent an automaton state.
c    -( b^{25, 7}_2 ∧  b^{25, 7}_1 ∧  b^{25, 7}_0 ∧ true) 
c  in CNF:
c    -b^{25, 7}_2 ∨ -b^{25, 7}_1 ∨ -b^{25, 7}_0 ∨ false 
c  in DIMACS:
-14378 -14379 -14380  0

c i = 8
c  -2+1 --> -1
c    ( b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧  p_200) -> ( b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0)
c  in CNF:
c    -b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨  b^{25, 9}_2
c    -b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_1
c    -b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨  b^{25, 9}_0
c  in DIMACS:
-14381 -14382  14383 -200  14384 0
-14381 -14382  14383 -200 -14385 0
-14381 -14382  14383 -200  14386 0

c  -1+1 --> 0
c    ( b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0 ∧  p_200) -> (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧ -b^{25, 9}_0)
c  in CNF:
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_2
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_1
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_0
c  in DIMACS:
-14381  14382 -14383 -200 -14384 0
-14381  14382 -14383 -200 -14385 0
-14381  14382 -14383 -200 -14386 0

c  0+1 --> 1
c    (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧  p_200) -> (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0)
c  in CNF:
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_2
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_1
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨  b^{25, 9}_0
c  in DIMACS:
 14381  14382  14383 -200 -14384 0
 14381  14382  14383 -200 -14385 0
 14381  14382  14383 -200  14386 0

c  1+1 --> 2
c    (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0 ∧  p_200) -> (-b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0)
c  in CNF:
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_2
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨  b^{25, 9}_1
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ -p_200 ∨ -b^{25, 9}_0
c  in DIMACS:
 14381  14382 -14383 -200 -14384 0
 14381  14382 -14383 -200  14385 0
 14381  14382 -14383 -200 -14386 0

c  2+1 --> break 
c    (-b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧  p_200) -> break
c  in CNF:
c     b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 14381 -14382  14383 -200 1162 0


c  2-1 --> 1
c    (-b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧ -p_200) -> (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0)
c  in CNF:
c     b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_2
c     b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_1
c     b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨  b^{25, 9}_0
c  in DIMACS:
 14381 -14382  14383  200 -14384 0
 14381 -14382  14383  200 -14385 0
 14381 -14382  14383  200  14386 0

c  1-1 --> 0
c    (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0 ∧ -p_200) -> (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧ -b^{25, 9}_0)
c  in CNF:
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_2
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_1
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_0
c  in DIMACS:
 14381  14382 -14383  200 -14384 0
 14381  14382 -14383  200 -14385 0
 14381  14382 -14383  200 -14386 0

c  0-1 --> -1
c    (-b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧ -p_200) -> ( b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0)
c  in CNF:
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨  b^{25, 9}_2
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_1
c     b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨  b^{25, 9}_0
c  in DIMACS:
 14381  14382  14383  200  14384 0
 14381  14382  14383  200 -14385 0
 14381  14382  14383  200  14386 0

c  -1-1 --> -2
c    ( b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧  b^{25, 8}_0 ∧ -p_200) -> ( b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0)
c  in CNF:
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨  b^{25, 9}_2
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨  b^{25, 9}_1
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨  p_200 ∨ -b^{25, 9}_0
c  in DIMACS:
-14381  14382 -14383  200  14384 0
-14381  14382 -14383  200  14385 0
-14381  14382 -14383  200 -14386 0

c  -2-1 --> break 
c    ( b^{25, 8}_2 ∧  b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨  b^{25, 8}_0 ∨  p_200 ∨ break
c  in DIMACS:
-14381 -14382  14383  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 8}_2 ∧ -b^{25, 8}_1 ∧ -b^{25, 8}_0 ∧ true) 
c  in CNF:
c    -b^{25, 8}_2 ∨  b^{25, 8}_1 ∨  b^{25, 8}_0 ∨ false 
c  in DIMACS:
-14381  14382  14383  0

c  3 does not represent an automaton state.
c    -(-b^{25, 8}_2 ∧  b^{25, 8}_1 ∧  b^{25, 8}_0 ∧ true) 
c  in CNF:
c     b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ false 
c  in DIMACS:
 14381 -14382 -14383  0
c  -3 does not represent an automaton state.
c    -( b^{25, 8}_2 ∧  b^{25, 8}_1 ∧  b^{25, 8}_0 ∧ true) 
c  in CNF:
c    -b^{25, 8}_2 ∨ -b^{25, 8}_1 ∨ -b^{25, 8}_0 ∨ false 
c  in DIMACS:
-14381 -14382 -14383  0

c i = 9
c  -2+1 --> -1
c    ( b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧  p_225) -> ( b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0)
c  in CNF:
c    -b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨  b^{25, 10}_2
c    -b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_1
c    -b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨  b^{25, 10}_0
c  in DIMACS:
-14384 -14385  14386 -225  14387 0
-14384 -14385  14386 -225 -14388 0
-14384 -14385  14386 -225  14389 0

c  -1+1 --> 0
c    ( b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0 ∧  p_225) -> (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧ -b^{25, 10}_0)
c  in CNF:
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_2
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_1
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_0
c  in DIMACS:
-14384  14385 -14386 -225 -14387 0
-14384  14385 -14386 -225 -14388 0
-14384  14385 -14386 -225 -14389 0

c  0+1 --> 1
c    (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧  p_225) -> (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0)
c  in CNF:
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_2
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_1
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨  b^{25, 10}_0
c  in DIMACS:
 14384  14385  14386 -225 -14387 0
 14384  14385  14386 -225 -14388 0
 14384  14385  14386 -225  14389 0

c  1+1 --> 2
c    (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0 ∧  p_225) -> (-b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0)
c  in CNF:
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_2
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨  b^{25, 10}_1
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ -p_225 ∨ -b^{25, 10}_0
c  in DIMACS:
 14384  14385 -14386 -225 -14387 0
 14384  14385 -14386 -225  14388 0
 14384  14385 -14386 -225 -14389 0

c  2+1 --> break 
c    (-b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧  p_225) -> break
c  in CNF:
c     b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 14384 -14385  14386 -225 1162 0


c  2-1 --> 1
c    (-b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧ -p_225) -> (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0)
c  in CNF:
c     b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_2
c     b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_1
c     b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨  b^{25, 10}_0
c  in DIMACS:
 14384 -14385  14386  225 -14387 0
 14384 -14385  14386  225 -14388 0
 14384 -14385  14386  225  14389 0

c  1-1 --> 0
c    (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0 ∧ -p_225) -> (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧ -b^{25, 10}_0)
c  in CNF:
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_2
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_1
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_0
c  in DIMACS:
 14384  14385 -14386  225 -14387 0
 14384  14385 -14386  225 -14388 0
 14384  14385 -14386  225 -14389 0

c  0-1 --> -1
c    (-b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧ -p_225) -> ( b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0)
c  in CNF:
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨  b^{25, 10}_2
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_1
c     b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨  b^{25, 10}_0
c  in DIMACS:
 14384  14385  14386  225  14387 0
 14384  14385  14386  225 -14388 0
 14384  14385  14386  225  14389 0

c  -1-1 --> -2
c    ( b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧  b^{25, 9}_0 ∧ -p_225) -> ( b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0)
c  in CNF:
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨  b^{25, 10}_2
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨  b^{25, 10}_1
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨  p_225 ∨ -b^{25, 10}_0
c  in DIMACS:
-14384  14385 -14386  225  14387 0
-14384  14385 -14386  225  14388 0
-14384  14385 -14386  225 -14389 0

c  -2-1 --> break 
c    ( b^{25, 9}_2 ∧  b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨  b^{25, 9}_0 ∨  p_225 ∨ break
c  in DIMACS:
-14384 -14385  14386  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 9}_2 ∧ -b^{25, 9}_1 ∧ -b^{25, 9}_0 ∧ true) 
c  in CNF:
c    -b^{25, 9}_2 ∨  b^{25, 9}_1 ∨  b^{25, 9}_0 ∨ false 
c  in DIMACS:
-14384  14385  14386  0

c  3 does not represent an automaton state.
c    -(-b^{25, 9}_2 ∧  b^{25, 9}_1 ∧  b^{25, 9}_0 ∧ true) 
c  in CNF:
c     b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ false 
c  in DIMACS:
 14384 -14385 -14386  0
c  -3 does not represent an automaton state.
c    -( b^{25, 9}_2 ∧  b^{25, 9}_1 ∧  b^{25, 9}_0 ∧ true) 
c  in CNF:
c    -b^{25, 9}_2 ∨ -b^{25, 9}_1 ∨ -b^{25, 9}_0 ∨ false 
c  in DIMACS:
-14384 -14385 -14386  0

c i = 10
c  -2+1 --> -1
c    ( b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧  p_250) -> ( b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0)
c  in CNF:
c    -b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨  b^{25, 11}_2
c    -b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_1
c    -b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨  b^{25, 11}_0
c  in DIMACS:
-14387 -14388  14389 -250  14390 0
-14387 -14388  14389 -250 -14391 0
-14387 -14388  14389 -250  14392 0

c  -1+1 --> 0
c    ( b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0 ∧  p_250) -> (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧ -b^{25, 11}_0)
c  in CNF:
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_2
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_1
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_0
c  in DIMACS:
-14387  14388 -14389 -250 -14390 0
-14387  14388 -14389 -250 -14391 0
-14387  14388 -14389 -250 -14392 0

c  0+1 --> 1
c    (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧  p_250) -> (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0)
c  in CNF:
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_2
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_1
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨  b^{25, 11}_0
c  in DIMACS:
 14387  14388  14389 -250 -14390 0
 14387  14388  14389 -250 -14391 0
 14387  14388  14389 -250  14392 0

c  1+1 --> 2
c    (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0 ∧  p_250) -> (-b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0)
c  in CNF:
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_2
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨  b^{25, 11}_1
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ -p_250 ∨ -b^{25, 11}_0
c  in DIMACS:
 14387  14388 -14389 -250 -14390 0
 14387  14388 -14389 -250  14391 0
 14387  14388 -14389 -250 -14392 0

c  2+1 --> break 
c    (-b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧  p_250) -> break
c  in CNF:
c     b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 14387 -14388  14389 -250 1162 0


c  2-1 --> 1
c    (-b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧ -p_250) -> (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0)
c  in CNF:
c     b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_2
c     b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_1
c     b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨  b^{25, 11}_0
c  in DIMACS:
 14387 -14388  14389  250 -14390 0
 14387 -14388  14389  250 -14391 0
 14387 -14388  14389  250  14392 0

c  1-1 --> 0
c    (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0 ∧ -p_250) -> (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧ -b^{25, 11}_0)
c  in CNF:
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_2
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_1
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_0
c  in DIMACS:
 14387  14388 -14389  250 -14390 0
 14387  14388 -14389  250 -14391 0
 14387  14388 -14389  250 -14392 0

c  0-1 --> -1
c    (-b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧ -p_250) -> ( b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0)
c  in CNF:
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨  b^{25, 11}_2
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_1
c     b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨  b^{25, 11}_0
c  in DIMACS:
 14387  14388  14389  250  14390 0
 14387  14388  14389  250 -14391 0
 14387  14388  14389  250  14392 0

c  -1-1 --> -2
c    ( b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧  b^{25, 10}_0 ∧ -p_250) -> ( b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0)
c  in CNF:
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨  b^{25, 11}_2
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨  b^{25, 11}_1
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨  p_250 ∨ -b^{25, 11}_0
c  in DIMACS:
-14387  14388 -14389  250  14390 0
-14387  14388 -14389  250  14391 0
-14387  14388 -14389  250 -14392 0

c  -2-1 --> break 
c    ( b^{25, 10}_2 ∧  b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨  b^{25, 10}_0 ∨  p_250 ∨ break
c  in DIMACS:
-14387 -14388  14389  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 10}_2 ∧ -b^{25, 10}_1 ∧ -b^{25, 10}_0 ∧ true) 
c  in CNF:
c    -b^{25, 10}_2 ∨  b^{25, 10}_1 ∨  b^{25, 10}_0 ∨ false 
c  in DIMACS:
-14387  14388  14389  0

c  3 does not represent an automaton state.
c    -(-b^{25, 10}_2 ∧  b^{25, 10}_1 ∧  b^{25, 10}_0 ∧ true) 
c  in CNF:
c     b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ false 
c  in DIMACS:
 14387 -14388 -14389  0
c  -3 does not represent an automaton state.
c    -( b^{25, 10}_2 ∧  b^{25, 10}_1 ∧  b^{25, 10}_0 ∧ true) 
c  in CNF:
c    -b^{25, 10}_2 ∨ -b^{25, 10}_1 ∨ -b^{25, 10}_0 ∨ false 
c  in DIMACS:
-14387 -14388 -14389  0

c i = 11
c  -2+1 --> -1
c    ( b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧  p_275) -> ( b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0)
c  in CNF:
c    -b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨  b^{25, 12}_2
c    -b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_1
c    -b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨  b^{25, 12}_0
c  in DIMACS:
-14390 -14391  14392 -275  14393 0
-14390 -14391  14392 -275 -14394 0
-14390 -14391  14392 -275  14395 0

c  -1+1 --> 0
c    ( b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0 ∧  p_275) -> (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧ -b^{25, 12}_0)
c  in CNF:
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_2
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_1
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_0
c  in DIMACS:
-14390  14391 -14392 -275 -14393 0
-14390  14391 -14392 -275 -14394 0
-14390  14391 -14392 -275 -14395 0

c  0+1 --> 1
c    (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧  p_275) -> (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0)
c  in CNF:
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_2
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_1
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨  b^{25, 12}_0
c  in DIMACS:
 14390  14391  14392 -275 -14393 0
 14390  14391  14392 -275 -14394 0
 14390  14391  14392 -275  14395 0

c  1+1 --> 2
c    (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0 ∧  p_275) -> (-b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0)
c  in CNF:
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_2
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨  b^{25, 12}_1
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ -p_275 ∨ -b^{25, 12}_0
c  in DIMACS:
 14390  14391 -14392 -275 -14393 0
 14390  14391 -14392 -275  14394 0
 14390  14391 -14392 -275 -14395 0

c  2+1 --> break 
c    (-b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧  p_275) -> break
c  in CNF:
c     b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 14390 -14391  14392 -275 1162 0


c  2-1 --> 1
c    (-b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧ -p_275) -> (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0)
c  in CNF:
c     b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_2
c     b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_1
c     b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨  b^{25, 12}_0
c  in DIMACS:
 14390 -14391  14392  275 -14393 0
 14390 -14391  14392  275 -14394 0
 14390 -14391  14392  275  14395 0

c  1-1 --> 0
c    (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0 ∧ -p_275) -> (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧ -b^{25, 12}_0)
c  in CNF:
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_2
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_1
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_0
c  in DIMACS:
 14390  14391 -14392  275 -14393 0
 14390  14391 -14392  275 -14394 0
 14390  14391 -14392  275 -14395 0

c  0-1 --> -1
c    (-b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧ -p_275) -> ( b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0)
c  in CNF:
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨  b^{25, 12}_2
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_1
c     b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨  b^{25, 12}_0
c  in DIMACS:
 14390  14391  14392  275  14393 0
 14390  14391  14392  275 -14394 0
 14390  14391  14392  275  14395 0

c  -1-1 --> -2
c    ( b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧  b^{25, 11}_0 ∧ -p_275) -> ( b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0)
c  in CNF:
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨  b^{25, 12}_2
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨  b^{25, 12}_1
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨  p_275 ∨ -b^{25, 12}_0
c  in DIMACS:
-14390  14391 -14392  275  14393 0
-14390  14391 -14392  275  14394 0
-14390  14391 -14392  275 -14395 0

c  -2-1 --> break 
c    ( b^{25, 11}_2 ∧  b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨  b^{25, 11}_0 ∨  p_275 ∨ break
c  in DIMACS:
-14390 -14391  14392  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 11}_2 ∧ -b^{25, 11}_1 ∧ -b^{25, 11}_0 ∧ true) 
c  in CNF:
c    -b^{25, 11}_2 ∨  b^{25, 11}_1 ∨  b^{25, 11}_0 ∨ false 
c  in DIMACS:
-14390  14391  14392  0

c  3 does not represent an automaton state.
c    -(-b^{25, 11}_2 ∧  b^{25, 11}_1 ∧  b^{25, 11}_0 ∧ true) 
c  in CNF:
c     b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ false 
c  in DIMACS:
 14390 -14391 -14392  0
c  -3 does not represent an automaton state.
c    -( b^{25, 11}_2 ∧  b^{25, 11}_1 ∧  b^{25, 11}_0 ∧ true) 
c  in CNF:
c    -b^{25, 11}_2 ∨ -b^{25, 11}_1 ∨ -b^{25, 11}_0 ∨ false 
c  in DIMACS:
-14390 -14391 -14392  0

c i = 12
c  -2+1 --> -1
c    ( b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧  p_300) -> ( b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0)
c  in CNF:
c    -b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨  b^{25, 13}_2
c    -b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_1
c    -b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨  b^{25, 13}_0
c  in DIMACS:
-14393 -14394  14395 -300  14396 0
-14393 -14394  14395 -300 -14397 0
-14393 -14394  14395 -300  14398 0

c  -1+1 --> 0
c    ( b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0 ∧  p_300) -> (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧ -b^{25, 13}_0)
c  in CNF:
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_2
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_1
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_0
c  in DIMACS:
-14393  14394 -14395 -300 -14396 0
-14393  14394 -14395 -300 -14397 0
-14393  14394 -14395 -300 -14398 0

c  0+1 --> 1
c    (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧  p_300) -> (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0)
c  in CNF:
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_2
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_1
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨  b^{25, 13}_0
c  in DIMACS:
 14393  14394  14395 -300 -14396 0
 14393  14394  14395 -300 -14397 0
 14393  14394  14395 -300  14398 0

c  1+1 --> 2
c    (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0 ∧  p_300) -> (-b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0)
c  in CNF:
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_2
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨  b^{25, 13}_1
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ -p_300 ∨ -b^{25, 13}_0
c  in DIMACS:
 14393  14394 -14395 -300 -14396 0
 14393  14394 -14395 -300  14397 0
 14393  14394 -14395 -300 -14398 0

c  2+1 --> break 
c    (-b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧  p_300) -> break
c  in CNF:
c     b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 14393 -14394  14395 -300 1162 0


c  2-1 --> 1
c    (-b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧ -p_300) -> (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0)
c  in CNF:
c     b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_2
c     b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_1
c     b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨  b^{25, 13}_0
c  in DIMACS:
 14393 -14394  14395  300 -14396 0
 14393 -14394  14395  300 -14397 0
 14393 -14394  14395  300  14398 0

c  1-1 --> 0
c    (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0 ∧ -p_300) -> (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧ -b^{25, 13}_0)
c  in CNF:
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_2
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_1
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_0
c  in DIMACS:
 14393  14394 -14395  300 -14396 0
 14393  14394 -14395  300 -14397 0
 14393  14394 -14395  300 -14398 0

c  0-1 --> -1
c    (-b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧ -p_300) -> ( b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0)
c  in CNF:
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨  b^{25, 13}_2
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_1
c     b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨  b^{25, 13}_0
c  in DIMACS:
 14393  14394  14395  300  14396 0
 14393  14394  14395  300 -14397 0
 14393  14394  14395  300  14398 0

c  -1-1 --> -2
c    ( b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧  b^{25, 12}_0 ∧ -p_300) -> ( b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0)
c  in CNF:
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨  b^{25, 13}_2
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨  b^{25, 13}_1
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨  p_300 ∨ -b^{25, 13}_0
c  in DIMACS:
-14393  14394 -14395  300  14396 0
-14393  14394 -14395  300  14397 0
-14393  14394 -14395  300 -14398 0

c  -2-1 --> break 
c    ( b^{25, 12}_2 ∧  b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨  b^{25, 12}_0 ∨  p_300 ∨ break
c  in DIMACS:
-14393 -14394  14395  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 12}_2 ∧ -b^{25, 12}_1 ∧ -b^{25, 12}_0 ∧ true) 
c  in CNF:
c    -b^{25, 12}_2 ∨  b^{25, 12}_1 ∨  b^{25, 12}_0 ∨ false 
c  in DIMACS:
-14393  14394  14395  0

c  3 does not represent an automaton state.
c    -(-b^{25, 12}_2 ∧  b^{25, 12}_1 ∧  b^{25, 12}_0 ∧ true) 
c  in CNF:
c     b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ false 
c  in DIMACS:
 14393 -14394 -14395  0
c  -3 does not represent an automaton state.
c    -( b^{25, 12}_2 ∧  b^{25, 12}_1 ∧  b^{25, 12}_0 ∧ true) 
c  in CNF:
c    -b^{25, 12}_2 ∨ -b^{25, 12}_1 ∨ -b^{25, 12}_0 ∨ false 
c  in DIMACS:
-14393 -14394 -14395  0

c i = 13
c  -2+1 --> -1
c    ( b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧  p_325) -> ( b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0)
c  in CNF:
c    -b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨  b^{25, 14}_2
c    -b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_1
c    -b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨  b^{25, 14}_0
c  in DIMACS:
-14396 -14397  14398 -325  14399 0
-14396 -14397  14398 -325 -14400 0
-14396 -14397  14398 -325  14401 0

c  -1+1 --> 0
c    ( b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0 ∧  p_325) -> (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧ -b^{25, 14}_0)
c  in CNF:
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_2
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_1
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_0
c  in DIMACS:
-14396  14397 -14398 -325 -14399 0
-14396  14397 -14398 -325 -14400 0
-14396  14397 -14398 -325 -14401 0

c  0+1 --> 1
c    (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧  p_325) -> (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0)
c  in CNF:
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_2
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_1
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨  b^{25, 14}_0
c  in DIMACS:
 14396  14397  14398 -325 -14399 0
 14396  14397  14398 -325 -14400 0
 14396  14397  14398 -325  14401 0

c  1+1 --> 2
c    (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0 ∧  p_325) -> (-b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0)
c  in CNF:
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_2
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨  b^{25, 14}_1
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ -p_325 ∨ -b^{25, 14}_0
c  in DIMACS:
 14396  14397 -14398 -325 -14399 0
 14396  14397 -14398 -325  14400 0
 14396  14397 -14398 -325 -14401 0

c  2+1 --> break 
c    (-b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧  p_325) -> break
c  in CNF:
c     b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 14396 -14397  14398 -325 1162 0


c  2-1 --> 1
c    (-b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧ -p_325) -> (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0)
c  in CNF:
c     b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_2
c     b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_1
c     b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨  b^{25, 14}_0
c  in DIMACS:
 14396 -14397  14398  325 -14399 0
 14396 -14397  14398  325 -14400 0
 14396 -14397  14398  325  14401 0

c  1-1 --> 0
c    (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0 ∧ -p_325) -> (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧ -b^{25, 14}_0)
c  in CNF:
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_2
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_1
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_0
c  in DIMACS:
 14396  14397 -14398  325 -14399 0
 14396  14397 -14398  325 -14400 0
 14396  14397 -14398  325 -14401 0

c  0-1 --> -1
c    (-b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧ -p_325) -> ( b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0)
c  in CNF:
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨  b^{25, 14}_2
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_1
c     b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨  b^{25, 14}_0
c  in DIMACS:
 14396  14397  14398  325  14399 0
 14396  14397  14398  325 -14400 0
 14396  14397  14398  325  14401 0

c  -1-1 --> -2
c    ( b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧  b^{25, 13}_0 ∧ -p_325) -> ( b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0)
c  in CNF:
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨  b^{25, 14}_2
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨  b^{25, 14}_1
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨  p_325 ∨ -b^{25, 14}_0
c  in DIMACS:
-14396  14397 -14398  325  14399 0
-14396  14397 -14398  325  14400 0
-14396  14397 -14398  325 -14401 0

c  -2-1 --> break 
c    ( b^{25, 13}_2 ∧  b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨  b^{25, 13}_0 ∨  p_325 ∨ break
c  in DIMACS:
-14396 -14397  14398  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 13}_2 ∧ -b^{25, 13}_1 ∧ -b^{25, 13}_0 ∧ true) 
c  in CNF:
c    -b^{25, 13}_2 ∨  b^{25, 13}_1 ∨  b^{25, 13}_0 ∨ false 
c  in DIMACS:
-14396  14397  14398  0

c  3 does not represent an automaton state.
c    -(-b^{25, 13}_2 ∧  b^{25, 13}_1 ∧  b^{25, 13}_0 ∧ true) 
c  in CNF:
c     b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ false 
c  in DIMACS:
 14396 -14397 -14398  0
c  -3 does not represent an automaton state.
c    -( b^{25, 13}_2 ∧  b^{25, 13}_1 ∧  b^{25, 13}_0 ∧ true) 
c  in CNF:
c    -b^{25, 13}_2 ∨ -b^{25, 13}_1 ∨ -b^{25, 13}_0 ∨ false 
c  in DIMACS:
-14396 -14397 -14398  0

c i = 14
c  -2+1 --> -1
c    ( b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧  p_350) -> ( b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0)
c  in CNF:
c    -b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨  b^{25, 15}_2
c    -b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_1
c    -b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨  b^{25, 15}_0
c  in DIMACS:
-14399 -14400  14401 -350  14402 0
-14399 -14400  14401 -350 -14403 0
-14399 -14400  14401 -350  14404 0

c  -1+1 --> 0
c    ( b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0 ∧  p_350) -> (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧ -b^{25, 15}_0)
c  in CNF:
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_2
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_1
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_0
c  in DIMACS:
-14399  14400 -14401 -350 -14402 0
-14399  14400 -14401 -350 -14403 0
-14399  14400 -14401 -350 -14404 0

c  0+1 --> 1
c    (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧  p_350) -> (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0)
c  in CNF:
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_2
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_1
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨  b^{25, 15}_0
c  in DIMACS:
 14399  14400  14401 -350 -14402 0
 14399  14400  14401 -350 -14403 0
 14399  14400  14401 -350  14404 0

c  1+1 --> 2
c    (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0 ∧  p_350) -> (-b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0)
c  in CNF:
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_2
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨  b^{25, 15}_1
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ -p_350 ∨ -b^{25, 15}_0
c  in DIMACS:
 14399  14400 -14401 -350 -14402 0
 14399  14400 -14401 -350  14403 0
 14399  14400 -14401 -350 -14404 0

c  2+1 --> break 
c    (-b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧  p_350) -> break
c  in CNF:
c     b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 14399 -14400  14401 -350 1162 0


c  2-1 --> 1
c    (-b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧ -p_350) -> (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0)
c  in CNF:
c     b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_2
c     b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_1
c     b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨  b^{25, 15}_0
c  in DIMACS:
 14399 -14400  14401  350 -14402 0
 14399 -14400  14401  350 -14403 0
 14399 -14400  14401  350  14404 0

c  1-1 --> 0
c    (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0 ∧ -p_350) -> (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧ -b^{25, 15}_0)
c  in CNF:
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_2
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_1
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_0
c  in DIMACS:
 14399  14400 -14401  350 -14402 0
 14399  14400 -14401  350 -14403 0
 14399  14400 -14401  350 -14404 0

c  0-1 --> -1
c    (-b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧ -p_350) -> ( b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0)
c  in CNF:
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨  b^{25, 15}_2
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_1
c     b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨  b^{25, 15}_0
c  in DIMACS:
 14399  14400  14401  350  14402 0
 14399  14400  14401  350 -14403 0
 14399  14400  14401  350  14404 0

c  -1-1 --> -2
c    ( b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧  b^{25, 14}_0 ∧ -p_350) -> ( b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0)
c  in CNF:
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨  b^{25, 15}_2
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨  b^{25, 15}_1
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨  p_350 ∨ -b^{25, 15}_0
c  in DIMACS:
-14399  14400 -14401  350  14402 0
-14399  14400 -14401  350  14403 0
-14399  14400 -14401  350 -14404 0

c  -2-1 --> break 
c    ( b^{25, 14}_2 ∧  b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨  b^{25, 14}_0 ∨  p_350 ∨ break
c  in DIMACS:
-14399 -14400  14401  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 14}_2 ∧ -b^{25, 14}_1 ∧ -b^{25, 14}_0 ∧ true) 
c  in CNF:
c    -b^{25, 14}_2 ∨  b^{25, 14}_1 ∨  b^{25, 14}_0 ∨ false 
c  in DIMACS:
-14399  14400  14401  0

c  3 does not represent an automaton state.
c    -(-b^{25, 14}_2 ∧  b^{25, 14}_1 ∧  b^{25, 14}_0 ∧ true) 
c  in CNF:
c     b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ false 
c  in DIMACS:
 14399 -14400 -14401  0
c  -3 does not represent an automaton state.
c    -( b^{25, 14}_2 ∧  b^{25, 14}_1 ∧  b^{25, 14}_0 ∧ true) 
c  in CNF:
c    -b^{25, 14}_2 ∨ -b^{25, 14}_1 ∨ -b^{25, 14}_0 ∨ false 
c  in DIMACS:
-14399 -14400 -14401  0

c i = 15
c  -2+1 --> -1
c    ( b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧  p_375) -> ( b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0)
c  in CNF:
c    -b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨  b^{25, 16}_2
c    -b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_1
c    -b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨  b^{25, 16}_0
c  in DIMACS:
-14402 -14403  14404 -375  14405 0
-14402 -14403  14404 -375 -14406 0
-14402 -14403  14404 -375  14407 0

c  -1+1 --> 0
c    ( b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0 ∧  p_375) -> (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧ -b^{25, 16}_0)
c  in CNF:
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_2
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_1
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_0
c  in DIMACS:
-14402  14403 -14404 -375 -14405 0
-14402  14403 -14404 -375 -14406 0
-14402  14403 -14404 -375 -14407 0

c  0+1 --> 1
c    (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧  p_375) -> (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0)
c  in CNF:
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_2
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_1
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨  b^{25, 16}_0
c  in DIMACS:
 14402  14403  14404 -375 -14405 0
 14402  14403  14404 -375 -14406 0
 14402  14403  14404 -375  14407 0

c  1+1 --> 2
c    (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0 ∧  p_375) -> (-b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0)
c  in CNF:
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_2
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨  b^{25, 16}_1
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ -p_375 ∨ -b^{25, 16}_0
c  in DIMACS:
 14402  14403 -14404 -375 -14405 0
 14402  14403 -14404 -375  14406 0
 14402  14403 -14404 -375 -14407 0

c  2+1 --> break 
c    (-b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧  p_375) -> break
c  in CNF:
c     b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 14402 -14403  14404 -375 1162 0


c  2-1 --> 1
c    (-b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧ -p_375) -> (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0)
c  in CNF:
c     b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_2
c     b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_1
c     b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨  b^{25, 16}_0
c  in DIMACS:
 14402 -14403  14404  375 -14405 0
 14402 -14403  14404  375 -14406 0
 14402 -14403  14404  375  14407 0

c  1-1 --> 0
c    (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0 ∧ -p_375) -> (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧ -b^{25, 16}_0)
c  in CNF:
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_2
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_1
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_0
c  in DIMACS:
 14402  14403 -14404  375 -14405 0
 14402  14403 -14404  375 -14406 0
 14402  14403 -14404  375 -14407 0

c  0-1 --> -1
c    (-b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧ -p_375) -> ( b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0)
c  in CNF:
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨  b^{25, 16}_2
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_1
c     b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨  b^{25, 16}_0
c  in DIMACS:
 14402  14403  14404  375  14405 0
 14402  14403  14404  375 -14406 0
 14402  14403  14404  375  14407 0

c  -1-1 --> -2
c    ( b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧  b^{25, 15}_0 ∧ -p_375) -> ( b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0)
c  in CNF:
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨  b^{25, 16}_2
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨  b^{25, 16}_1
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨  p_375 ∨ -b^{25, 16}_0
c  in DIMACS:
-14402  14403 -14404  375  14405 0
-14402  14403 -14404  375  14406 0
-14402  14403 -14404  375 -14407 0

c  -2-1 --> break 
c    ( b^{25, 15}_2 ∧  b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨  b^{25, 15}_0 ∨  p_375 ∨ break
c  in DIMACS:
-14402 -14403  14404  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 15}_2 ∧ -b^{25, 15}_1 ∧ -b^{25, 15}_0 ∧ true) 
c  in CNF:
c    -b^{25, 15}_2 ∨  b^{25, 15}_1 ∨  b^{25, 15}_0 ∨ false 
c  in DIMACS:
-14402  14403  14404  0

c  3 does not represent an automaton state.
c    -(-b^{25, 15}_2 ∧  b^{25, 15}_1 ∧  b^{25, 15}_0 ∧ true) 
c  in CNF:
c     b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ false 
c  in DIMACS:
 14402 -14403 -14404  0
c  -3 does not represent an automaton state.
c    -( b^{25, 15}_2 ∧  b^{25, 15}_1 ∧  b^{25, 15}_0 ∧ true) 
c  in CNF:
c    -b^{25, 15}_2 ∨ -b^{25, 15}_1 ∨ -b^{25, 15}_0 ∨ false 
c  in DIMACS:
-14402 -14403 -14404  0

c i = 16
c  -2+1 --> -1
c    ( b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧  p_400) -> ( b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0)
c  in CNF:
c    -b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨  b^{25, 17}_2
c    -b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_1
c    -b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨  b^{25, 17}_0
c  in DIMACS:
-14405 -14406  14407 -400  14408 0
-14405 -14406  14407 -400 -14409 0
-14405 -14406  14407 -400  14410 0

c  -1+1 --> 0
c    ( b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0 ∧  p_400) -> (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧ -b^{25, 17}_0)
c  in CNF:
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_2
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_1
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_0
c  in DIMACS:
-14405  14406 -14407 -400 -14408 0
-14405  14406 -14407 -400 -14409 0
-14405  14406 -14407 -400 -14410 0

c  0+1 --> 1
c    (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧  p_400) -> (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0)
c  in CNF:
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_2
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_1
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨  b^{25, 17}_0
c  in DIMACS:
 14405  14406  14407 -400 -14408 0
 14405  14406  14407 -400 -14409 0
 14405  14406  14407 -400  14410 0

c  1+1 --> 2
c    (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0 ∧  p_400) -> (-b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0)
c  in CNF:
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_2
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨  b^{25, 17}_1
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ -p_400 ∨ -b^{25, 17}_0
c  in DIMACS:
 14405  14406 -14407 -400 -14408 0
 14405  14406 -14407 -400  14409 0
 14405  14406 -14407 -400 -14410 0

c  2+1 --> break 
c    (-b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧  p_400) -> break
c  in CNF:
c     b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 14405 -14406  14407 -400 1162 0


c  2-1 --> 1
c    (-b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧ -p_400) -> (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0)
c  in CNF:
c     b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_2
c     b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_1
c     b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨  b^{25, 17}_0
c  in DIMACS:
 14405 -14406  14407  400 -14408 0
 14405 -14406  14407  400 -14409 0
 14405 -14406  14407  400  14410 0

c  1-1 --> 0
c    (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0 ∧ -p_400) -> (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧ -b^{25, 17}_0)
c  in CNF:
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_2
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_1
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_0
c  in DIMACS:
 14405  14406 -14407  400 -14408 0
 14405  14406 -14407  400 -14409 0
 14405  14406 -14407  400 -14410 0

c  0-1 --> -1
c    (-b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧ -p_400) -> ( b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0)
c  in CNF:
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨  b^{25, 17}_2
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_1
c     b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨  b^{25, 17}_0
c  in DIMACS:
 14405  14406  14407  400  14408 0
 14405  14406  14407  400 -14409 0
 14405  14406  14407  400  14410 0

c  -1-1 --> -2
c    ( b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧  b^{25, 16}_0 ∧ -p_400) -> ( b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0)
c  in CNF:
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨  b^{25, 17}_2
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨  b^{25, 17}_1
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨  p_400 ∨ -b^{25, 17}_0
c  in DIMACS:
-14405  14406 -14407  400  14408 0
-14405  14406 -14407  400  14409 0
-14405  14406 -14407  400 -14410 0

c  -2-1 --> break 
c    ( b^{25, 16}_2 ∧  b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨  b^{25, 16}_0 ∨  p_400 ∨ break
c  in DIMACS:
-14405 -14406  14407  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 16}_2 ∧ -b^{25, 16}_1 ∧ -b^{25, 16}_0 ∧ true) 
c  in CNF:
c    -b^{25, 16}_2 ∨  b^{25, 16}_1 ∨  b^{25, 16}_0 ∨ false 
c  in DIMACS:
-14405  14406  14407  0

c  3 does not represent an automaton state.
c    -(-b^{25, 16}_2 ∧  b^{25, 16}_1 ∧  b^{25, 16}_0 ∧ true) 
c  in CNF:
c     b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ false 
c  in DIMACS:
 14405 -14406 -14407  0
c  -3 does not represent an automaton state.
c    -( b^{25, 16}_2 ∧  b^{25, 16}_1 ∧  b^{25, 16}_0 ∧ true) 
c  in CNF:
c    -b^{25, 16}_2 ∨ -b^{25, 16}_1 ∨ -b^{25, 16}_0 ∨ false 
c  in DIMACS:
-14405 -14406 -14407  0

c i = 17
c  -2+1 --> -1
c    ( b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧  p_425) -> ( b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0)
c  in CNF:
c    -b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨  b^{25, 18}_2
c    -b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_1
c    -b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨  b^{25, 18}_0
c  in DIMACS:
-14408 -14409  14410 -425  14411 0
-14408 -14409  14410 -425 -14412 0
-14408 -14409  14410 -425  14413 0

c  -1+1 --> 0
c    ( b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0 ∧  p_425) -> (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧ -b^{25, 18}_0)
c  in CNF:
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_2
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_1
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_0
c  in DIMACS:
-14408  14409 -14410 -425 -14411 0
-14408  14409 -14410 -425 -14412 0
-14408  14409 -14410 -425 -14413 0

c  0+1 --> 1
c    (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧  p_425) -> (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0)
c  in CNF:
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_2
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_1
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨  b^{25, 18}_0
c  in DIMACS:
 14408  14409  14410 -425 -14411 0
 14408  14409  14410 -425 -14412 0
 14408  14409  14410 -425  14413 0

c  1+1 --> 2
c    (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0 ∧  p_425) -> (-b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0)
c  in CNF:
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_2
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨  b^{25, 18}_1
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ -p_425 ∨ -b^{25, 18}_0
c  in DIMACS:
 14408  14409 -14410 -425 -14411 0
 14408  14409 -14410 -425  14412 0
 14408  14409 -14410 -425 -14413 0

c  2+1 --> break 
c    (-b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧  p_425) -> break
c  in CNF:
c     b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ -p_425 ∨ break
c  in DIMACS:
 14408 -14409  14410 -425 1162 0


c  2-1 --> 1
c    (-b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧ -p_425) -> (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0)
c  in CNF:
c     b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_2
c     b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_1
c     b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨  b^{25, 18}_0
c  in DIMACS:
 14408 -14409  14410  425 -14411 0
 14408 -14409  14410  425 -14412 0
 14408 -14409  14410  425  14413 0

c  1-1 --> 0
c    (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0 ∧ -p_425) -> (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧ -b^{25, 18}_0)
c  in CNF:
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_2
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_1
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_0
c  in DIMACS:
 14408  14409 -14410  425 -14411 0
 14408  14409 -14410  425 -14412 0
 14408  14409 -14410  425 -14413 0

c  0-1 --> -1
c    (-b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧ -p_425) -> ( b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0)
c  in CNF:
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨  b^{25, 18}_2
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_1
c     b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨  b^{25, 18}_0
c  in DIMACS:
 14408  14409  14410  425  14411 0
 14408  14409  14410  425 -14412 0
 14408  14409  14410  425  14413 0

c  -1-1 --> -2
c    ( b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧  b^{25, 17}_0 ∧ -p_425) -> ( b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0)
c  in CNF:
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨  b^{25, 18}_2
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨  b^{25, 18}_1
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨  p_425 ∨ -b^{25, 18}_0
c  in DIMACS:
-14408  14409 -14410  425  14411 0
-14408  14409 -14410  425  14412 0
-14408  14409 -14410  425 -14413 0

c  -2-1 --> break 
c    ( b^{25, 17}_2 ∧  b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧ -p_425) -> break
c  in CNF:
c    -b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨  b^{25, 17}_0 ∨  p_425 ∨ break
c  in DIMACS:
-14408 -14409  14410  425 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 17}_2 ∧ -b^{25, 17}_1 ∧ -b^{25, 17}_0 ∧ true) 
c  in CNF:
c    -b^{25, 17}_2 ∨  b^{25, 17}_1 ∨  b^{25, 17}_0 ∨ false 
c  in DIMACS:
-14408  14409  14410  0

c  3 does not represent an automaton state.
c    -(-b^{25, 17}_2 ∧  b^{25, 17}_1 ∧  b^{25, 17}_0 ∧ true) 
c  in CNF:
c     b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ false 
c  in DIMACS:
 14408 -14409 -14410  0
c  -3 does not represent an automaton state.
c    -( b^{25, 17}_2 ∧  b^{25, 17}_1 ∧  b^{25, 17}_0 ∧ true) 
c  in CNF:
c    -b^{25, 17}_2 ∨ -b^{25, 17}_1 ∨ -b^{25, 17}_0 ∨ false 
c  in DIMACS:
-14408 -14409 -14410  0

c i = 18
c  -2+1 --> -1
c    ( b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧  p_450) -> ( b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0)
c  in CNF:
c    -b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨  b^{25, 19}_2
c    -b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_1
c    -b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨  b^{25, 19}_0
c  in DIMACS:
-14411 -14412  14413 -450  14414 0
-14411 -14412  14413 -450 -14415 0
-14411 -14412  14413 -450  14416 0

c  -1+1 --> 0
c    ( b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0 ∧  p_450) -> (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧ -b^{25, 19}_0)
c  in CNF:
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_2
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_1
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_0
c  in DIMACS:
-14411  14412 -14413 -450 -14414 0
-14411  14412 -14413 -450 -14415 0
-14411  14412 -14413 -450 -14416 0

c  0+1 --> 1
c    (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧  p_450) -> (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0)
c  in CNF:
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_2
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_1
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨  b^{25, 19}_0
c  in DIMACS:
 14411  14412  14413 -450 -14414 0
 14411  14412  14413 -450 -14415 0
 14411  14412  14413 -450  14416 0

c  1+1 --> 2
c    (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0 ∧  p_450) -> (-b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0)
c  in CNF:
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_2
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨  b^{25, 19}_1
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ -p_450 ∨ -b^{25, 19}_0
c  in DIMACS:
 14411  14412 -14413 -450 -14414 0
 14411  14412 -14413 -450  14415 0
 14411  14412 -14413 -450 -14416 0

c  2+1 --> break 
c    (-b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧  p_450) -> break
c  in CNF:
c     b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 14411 -14412  14413 -450 1162 0


c  2-1 --> 1
c    (-b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧ -p_450) -> (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0)
c  in CNF:
c     b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_2
c     b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_1
c     b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨  b^{25, 19}_0
c  in DIMACS:
 14411 -14412  14413  450 -14414 0
 14411 -14412  14413  450 -14415 0
 14411 -14412  14413  450  14416 0

c  1-1 --> 0
c    (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0 ∧ -p_450) -> (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧ -b^{25, 19}_0)
c  in CNF:
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_2
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_1
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_0
c  in DIMACS:
 14411  14412 -14413  450 -14414 0
 14411  14412 -14413  450 -14415 0
 14411  14412 -14413  450 -14416 0

c  0-1 --> -1
c    (-b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧ -p_450) -> ( b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0)
c  in CNF:
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨  b^{25, 19}_2
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_1
c     b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨  b^{25, 19}_0
c  in DIMACS:
 14411  14412  14413  450  14414 0
 14411  14412  14413  450 -14415 0
 14411  14412  14413  450  14416 0

c  -1-1 --> -2
c    ( b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧  b^{25, 18}_0 ∧ -p_450) -> ( b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0)
c  in CNF:
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨  b^{25, 19}_2
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨  b^{25, 19}_1
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨  p_450 ∨ -b^{25, 19}_0
c  in DIMACS:
-14411  14412 -14413  450  14414 0
-14411  14412 -14413  450  14415 0
-14411  14412 -14413  450 -14416 0

c  -2-1 --> break 
c    ( b^{25, 18}_2 ∧  b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨  b^{25, 18}_0 ∨  p_450 ∨ break
c  in DIMACS:
-14411 -14412  14413  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 18}_2 ∧ -b^{25, 18}_1 ∧ -b^{25, 18}_0 ∧ true) 
c  in CNF:
c    -b^{25, 18}_2 ∨  b^{25, 18}_1 ∨  b^{25, 18}_0 ∨ false 
c  in DIMACS:
-14411  14412  14413  0

c  3 does not represent an automaton state.
c    -(-b^{25, 18}_2 ∧  b^{25, 18}_1 ∧  b^{25, 18}_0 ∧ true) 
c  in CNF:
c     b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ false 
c  in DIMACS:
 14411 -14412 -14413  0
c  -3 does not represent an automaton state.
c    -( b^{25, 18}_2 ∧  b^{25, 18}_1 ∧  b^{25, 18}_0 ∧ true) 
c  in CNF:
c    -b^{25, 18}_2 ∨ -b^{25, 18}_1 ∨ -b^{25, 18}_0 ∨ false 
c  in DIMACS:
-14411 -14412 -14413  0

c i = 19
c  -2+1 --> -1
c    ( b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧  p_475) -> ( b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0)
c  in CNF:
c    -b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨  b^{25, 20}_2
c    -b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_1
c    -b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨  b^{25, 20}_0
c  in DIMACS:
-14414 -14415  14416 -475  14417 0
-14414 -14415  14416 -475 -14418 0
-14414 -14415  14416 -475  14419 0

c  -1+1 --> 0
c    ( b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0 ∧  p_475) -> (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧ -b^{25, 20}_0)
c  in CNF:
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_2
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_1
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_0
c  in DIMACS:
-14414  14415 -14416 -475 -14417 0
-14414  14415 -14416 -475 -14418 0
-14414  14415 -14416 -475 -14419 0

c  0+1 --> 1
c    (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧  p_475) -> (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0)
c  in CNF:
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_2
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_1
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨  b^{25, 20}_0
c  in DIMACS:
 14414  14415  14416 -475 -14417 0
 14414  14415  14416 -475 -14418 0
 14414  14415  14416 -475  14419 0

c  1+1 --> 2
c    (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0 ∧  p_475) -> (-b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0)
c  in CNF:
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_2
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨  b^{25, 20}_1
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ -p_475 ∨ -b^{25, 20}_0
c  in DIMACS:
 14414  14415 -14416 -475 -14417 0
 14414  14415 -14416 -475  14418 0
 14414  14415 -14416 -475 -14419 0

c  2+1 --> break 
c    (-b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧  p_475) -> break
c  in CNF:
c     b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ -p_475 ∨ break
c  in DIMACS:
 14414 -14415  14416 -475 1162 0


c  2-1 --> 1
c    (-b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧ -p_475) -> (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0)
c  in CNF:
c     b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_2
c     b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_1
c     b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨  b^{25, 20}_0
c  in DIMACS:
 14414 -14415  14416  475 -14417 0
 14414 -14415  14416  475 -14418 0
 14414 -14415  14416  475  14419 0

c  1-1 --> 0
c    (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0 ∧ -p_475) -> (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧ -b^{25, 20}_0)
c  in CNF:
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_2
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_1
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_0
c  in DIMACS:
 14414  14415 -14416  475 -14417 0
 14414  14415 -14416  475 -14418 0
 14414  14415 -14416  475 -14419 0

c  0-1 --> -1
c    (-b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧ -p_475) -> ( b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0)
c  in CNF:
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨  b^{25, 20}_2
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_1
c     b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨  b^{25, 20}_0
c  in DIMACS:
 14414  14415  14416  475  14417 0
 14414  14415  14416  475 -14418 0
 14414  14415  14416  475  14419 0

c  -1-1 --> -2
c    ( b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧  b^{25, 19}_0 ∧ -p_475) -> ( b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0)
c  in CNF:
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨  b^{25, 20}_2
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨  b^{25, 20}_1
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨  p_475 ∨ -b^{25, 20}_0
c  in DIMACS:
-14414  14415 -14416  475  14417 0
-14414  14415 -14416  475  14418 0
-14414  14415 -14416  475 -14419 0

c  -2-1 --> break 
c    ( b^{25, 19}_2 ∧  b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧ -p_475) -> break
c  in CNF:
c    -b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨  b^{25, 19}_0 ∨  p_475 ∨ break
c  in DIMACS:
-14414 -14415  14416  475 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 19}_2 ∧ -b^{25, 19}_1 ∧ -b^{25, 19}_0 ∧ true) 
c  in CNF:
c    -b^{25, 19}_2 ∨  b^{25, 19}_1 ∨  b^{25, 19}_0 ∨ false 
c  in DIMACS:
-14414  14415  14416  0

c  3 does not represent an automaton state.
c    -(-b^{25, 19}_2 ∧  b^{25, 19}_1 ∧  b^{25, 19}_0 ∧ true) 
c  in CNF:
c     b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ false 
c  in DIMACS:
 14414 -14415 -14416  0
c  -3 does not represent an automaton state.
c    -( b^{25, 19}_2 ∧  b^{25, 19}_1 ∧  b^{25, 19}_0 ∧ true) 
c  in CNF:
c    -b^{25, 19}_2 ∨ -b^{25, 19}_1 ∨ -b^{25, 19}_0 ∨ false 
c  in DIMACS:
-14414 -14415 -14416  0

c i = 20
c  -2+1 --> -1
c    ( b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧  p_500) -> ( b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0)
c  in CNF:
c    -b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨  b^{25, 21}_2
c    -b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_1
c    -b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨  b^{25, 21}_0
c  in DIMACS:
-14417 -14418  14419 -500  14420 0
-14417 -14418  14419 -500 -14421 0
-14417 -14418  14419 -500  14422 0

c  -1+1 --> 0
c    ( b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0 ∧  p_500) -> (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧ -b^{25, 21}_0)
c  in CNF:
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_2
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_1
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_0
c  in DIMACS:
-14417  14418 -14419 -500 -14420 0
-14417  14418 -14419 -500 -14421 0
-14417  14418 -14419 -500 -14422 0

c  0+1 --> 1
c    (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧  p_500) -> (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0)
c  in CNF:
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_2
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_1
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨  b^{25, 21}_0
c  in DIMACS:
 14417  14418  14419 -500 -14420 0
 14417  14418  14419 -500 -14421 0
 14417  14418  14419 -500  14422 0

c  1+1 --> 2
c    (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0 ∧  p_500) -> (-b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0)
c  in CNF:
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_2
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨  b^{25, 21}_1
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ -p_500 ∨ -b^{25, 21}_0
c  in DIMACS:
 14417  14418 -14419 -500 -14420 0
 14417  14418 -14419 -500  14421 0
 14417  14418 -14419 -500 -14422 0

c  2+1 --> break 
c    (-b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧  p_500) -> break
c  in CNF:
c     b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 14417 -14418  14419 -500 1162 0


c  2-1 --> 1
c    (-b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧ -p_500) -> (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0)
c  in CNF:
c     b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_2
c     b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_1
c     b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨  b^{25, 21}_0
c  in DIMACS:
 14417 -14418  14419  500 -14420 0
 14417 -14418  14419  500 -14421 0
 14417 -14418  14419  500  14422 0

c  1-1 --> 0
c    (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0 ∧ -p_500) -> (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧ -b^{25, 21}_0)
c  in CNF:
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_2
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_1
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_0
c  in DIMACS:
 14417  14418 -14419  500 -14420 0
 14417  14418 -14419  500 -14421 0
 14417  14418 -14419  500 -14422 0

c  0-1 --> -1
c    (-b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧ -p_500) -> ( b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0)
c  in CNF:
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨  b^{25, 21}_2
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_1
c     b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨  b^{25, 21}_0
c  in DIMACS:
 14417  14418  14419  500  14420 0
 14417  14418  14419  500 -14421 0
 14417  14418  14419  500  14422 0

c  -1-1 --> -2
c    ( b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧  b^{25, 20}_0 ∧ -p_500) -> ( b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0)
c  in CNF:
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨  b^{25, 21}_2
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨  b^{25, 21}_1
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨  p_500 ∨ -b^{25, 21}_0
c  in DIMACS:
-14417  14418 -14419  500  14420 0
-14417  14418 -14419  500  14421 0
-14417  14418 -14419  500 -14422 0

c  -2-1 --> break 
c    ( b^{25, 20}_2 ∧  b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨  b^{25, 20}_0 ∨  p_500 ∨ break
c  in DIMACS:
-14417 -14418  14419  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 20}_2 ∧ -b^{25, 20}_1 ∧ -b^{25, 20}_0 ∧ true) 
c  in CNF:
c    -b^{25, 20}_2 ∨  b^{25, 20}_1 ∨  b^{25, 20}_0 ∨ false 
c  in DIMACS:
-14417  14418  14419  0

c  3 does not represent an automaton state.
c    -(-b^{25, 20}_2 ∧  b^{25, 20}_1 ∧  b^{25, 20}_0 ∧ true) 
c  in CNF:
c     b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ false 
c  in DIMACS:
 14417 -14418 -14419  0
c  -3 does not represent an automaton state.
c    -( b^{25, 20}_2 ∧  b^{25, 20}_1 ∧  b^{25, 20}_0 ∧ true) 
c  in CNF:
c    -b^{25, 20}_2 ∨ -b^{25, 20}_1 ∨ -b^{25, 20}_0 ∨ false 
c  in DIMACS:
-14417 -14418 -14419  0

c i = 21
c  -2+1 --> -1
c    ( b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧  p_525) -> ( b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0)
c  in CNF:
c    -b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨  b^{25, 22}_2
c    -b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_1
c    -b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨  b^{25, 22}_0
c  in DIMACS:
-14420 -14421  14422 -525  14423 0
-14420 -14421  14422 -525 -14424 0
-14420 -14421  14422 -525  14425 0

c  -1+1 --> 0
c    ( b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0 ∧  p_525) -> (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧ -b^{25, 22}_0)
c  in CNF:
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_2
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_1
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_0
c  in DIMACS:
-14420  14421 -14422 -525 -14423 0
-14420  14421 -14422 -525 -14424 0
-14420  14421 -14422 -525 -14425 0

c  0+1 --> 1
c    (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧  p_525) -> (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0)
c  in CNF:
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_2
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_1
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨  b^{25, 22}_0
c  in DIMACS:
 14420  14421  14422 -525 -14423 0
 14420  14421  14422 -525 -14424 0
 14420  14421  14422 -525  14425 0

c  1+1 --> 2
c    (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0 ∧  p_525) -> (-b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0)
c  in CNF:
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_2
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨  b^{25, 22}_1
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ -p_525 ∨ -b^{25, 22}_0
c  in DIMACS:
 14420  14421 -14422 -525 -14423 0
 14420  14421 -14422 -525  14424 0
 14420  14421 -14422 -525 -14425 0

c  2+1 --> break 
c    (-b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧  p_525) -> break
c  in CNF:
c     b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 14420 -14421  14422 -525 1162 0


c  2-1 --> 1
c    (-b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧ -p_525) -> (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0)
c  in CNF:
c     b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_2
c     b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_1
c     b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨  b^{25, 22}_0
c  in DIMACS:
 14420 -14421  14422  525 -14423 0
 14420 -14421  14422  525 -14424 0
 14420 -14421  14422  525  14425 0

c  1-1 --> 0
c    (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0 ∧ -p_525) -> (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧ -b^{25, 22}_0)
c  in CNF:
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_2
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_1
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_0
c  in DIMACS:
 14420  14421 -14422  525 -14423 0
 14420  14421 -14422  525 -14424 0
 14420  14421 -14422  525 -14425 0

c  0-1 --> -1
c    (-b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧ -p_525) -> ( b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0)
c  in CNF:
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨  b^{25, 22}_2
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_1
c     b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨  b^{25, 22}_0
c  in DIMACS:
 14420  14421  14422  525  14423 0
 14420  14421  14422  525 -14424 0
 14420  14421  14422  525  14425 0

c  -1-1 --> -2
c    ( b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧  b^{25, 21}_0 ∧ -p_525) -> ( b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0)
c  in CNF:
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨  b^{25, 22}_2
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨  b^{25, 22}_1
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨  p_525 ∨ -b^{25, 22}_0
c  in DIMACS:
-14420  14421 -14422  525  14423 0
-14420  14421 -14422  525  14424 0
-14420  14421 -14422  525 -14425 0

c  -2-1 --> break 
c    ( b^{25, 21}_2 ∧  b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨  b^{25, 21}_0 ∨  p_525 ∨ break
c  in DIMACS:
-14420 -14421  14422  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 21}_2 ∧ -b^{25, 21}_1 ∧ -b^{25, 21}_0 ∧ true) 
c  in CNF:
c    -b^{25, 21}_2 ∨  b^{25, 21}_1 ∨  b^{25, 21}_0 ∨ false 
c  in DIMACS:
-14420  14421  14422  0

c  3 does not represent an automaton state.
c    -(-b^{25, 21}_2 ∧  b^{25, 21}_1 ∧  b^{25, 21}_0 ∧ true) 
c  in CNF:
c     b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ false 
c  in DIMACS:
 14420 -14421 -14422  0
c  -3 does not represent an automaton state.
c    -( b^{25, 21}_2 ∧  b^{25, 21}_1 ∧  b^{25, 21}_0 ∧ true) 
c  in CNF:
c    -b^{25, 21}_2 ∨ -b^{25, 21}_1 ∨ -b^{25, 21}_0 ∨ false 
c  in DIMACS:
-14420 -14421 -14422  0

c i = 22
c  -2+1 --> -1
c    ( b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧  p_550) -> ( b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0)
c  in CNF:
c    -b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨  b^{25, 23}_2
c    -b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_1
c    -b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨  b^{25, 23}_0
c  in DIMACS:
-14423 -14424  14425 -550  14426 0
-14423 -14424  14425 -550 -14427 0
-14423 -14424  14425 -550  14428 0

c  -1+1 --> 0
c    ( b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0 ∧  p_550) -> (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧ -b^{25, 23}_0)
c  in CNF:
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_2
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_1
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_0
c  in DIMACS:
-14423  14424 -14425 -550 -14426 0
-14423  14424 -14425 -550 -14427 0
-14423  14424 -14425 -550 -14428 0

c  0+1 --> 1
c    (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧  p_550) -> (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0)
c  in CNF:
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_2
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_1
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨  b^{25, 23}_0
c  in DIMACS:
 14423  14424  14425 -550 -14426 0
 14423  14424  14425 -550 -14427 0
 14423  14424  14425 -550  14428 0

c  1+1 --> 2
c    (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0 ∧  p_550) -> (-b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0)
c  in CNF:
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_2
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨  b^{25, 23}_1
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ -p_550 ∨ -b^{25, 23}_0
c  in DIMACS:
 14423  14424 -14425 -550 -14426 0
 14423  14424 -14425 -550  14427 0
 14423  14424 -14425 -550 -14428 0

c  2+1 --> break 
c    (-b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧  p_550) -> break
c  in CNF:
c     b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 14423 -14424  14425 -550 1162 0


c  2-1 --> 1
c    (-b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧ -p_550) -> (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0)
c  in CNF:
c     b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_2
c     b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_1
c     b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨  b^{25, 23}_0
c  in DIMACS:
 14423 -14424  14425  550 -14426 0
 14423 -14424  14425  550 -14427 0
 14423 -14424  14425  550  14428 0

c  1-1 --> 0
c    (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0 ∧ -p_550) -> (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧ -b^{25, 23}_0)
c  in CNF:
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_2
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_1
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_0
c  in DIMACS:
 14423  14424 -14425  550 -14426 0
 14423  14424 -14425  550 -14427 0
 14423  14424 -14425  550 -14428 0

c  0-1 --> -1
c    (-b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧ -p_550) -> ( b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0)
c  in CNF:
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨  b^{25, 23}_2
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_1
c     b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨  b^{25, 23}_0
c  in DIMACS:
 14423  14424  14425  550  14426 0
 14423  14424  14425  550 -14427 0
 14423  14424  14425  550  14428 0

c  -1-1 --> -2
c    ( b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧  b^{25, 22}_0 ∧ -p_550) -> ( b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0)
c  in CNF:
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨  b^{25, 23}_2
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨  b^{25, 23}_1
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨  p_550 ∨ -b^{25, 23}_0
c  in DIMACS:
-14423  14424 -14425  550  14426 0
-14423  14424 -14425  550  14427 0
-14423  14424 -14425  550 -14428 0

c  -2-1 --> break 
c    ( b^{25, 22}_2 ∧  b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨  b^{25, 22}_0 ∨  p_550 ∨ break
c  in DIMACS:
-14423 -14424  14425  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 22}_2 ∧ -b^{25, 22}_1 ∧ -b^{25, 22}_0 ∧ true) 
c  in CNF:
c    -b^{25, 22}_2 ∨  b^{25, 22}_1 ∨  b^{25, 22}_0 ∨ false 
c  in DIMACS:
-14423  14424  14425  0

c  3 does not represent an automaton state.
c    -(-b^{25, 22}_2 ∧  b^{25, 22}_1 ∧  b^{25, 22}_0 ∧ true) 
c  in CNF:
c     b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ false 
c  in DIMACS:
 14423 -14424 -14425  0
c  -3 does not represent an automaton state.
c    -( b^{25, 22}_2 ∧  b^{25, 22}_1 ∧  b^{25, 22}_0 ∧ true) 
c  in CNF:
c    -b^{25, 22}_2 ∨ -b^{25, 22}_1 ∨ -b^{25, 22}_0 ∨ false 
c  in DIMACS:
-14423 -14424 -14425  0

c i = 23
c  -2+1 --> -1
c    ( b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧  p_575) -> ( b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0)
c  in CNF:
c    -b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨  b^{25, 24}_2
c    -b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_1
c    -b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨  b^{25, 24}_0
c  in DIMACS:
-14426 -14427  14428 -575  14429 0
-14426 -14427  14428 -575 -14430 0
-14426 -14427  14428 -575  14431 0

c  -1+1 --> 0
c    ( b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0 ∧  p_575) -> (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧ -b^{25, 24}_0)
c  in CNF:
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_2
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_1
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_0
c  in DIMACS:
-14426  14427 -14428 -575 -14429 0
-14426  14427 -14428 -575 -14430 0
-14426  14427 -14428 -575 -14431 0

c  0+1 --> 1
c    (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧  p_575) -> (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0)
c  in CNF:
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_2
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_1
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨  b^{25, 24}_0
c  in DIMACS:
 14426  14427  14428 -575 -14429 0
 14426  14427  14428 -575 -14430 0
 14426  14427  14428 -575  14431 0

c  1+1 --> 2
c    (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0 ∧  p_575) -> (-b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0)
c  in CNF:
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_2
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨  b^{25, 24}_1
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ -p_575 ∨ -b^{25, 24}_0
c  in DIMACS:
 14426  14427 -14428 -575 -14429 0
 14426  14427 -14428 -575  14430 0
 14426  14427 -14428 -575 -14431 0

c  2+1 --> break 
c    (-b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧  p_575) -> break
c  in CNF:
c     b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ -p_575 ∨ break
c  in DIMACS:
 14426 -14427  14428 -575 1162 0


c  2-1 --> 1
c    (-b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧ -p_575) -> (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0)
c  in CNF:
c     b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_2
c     b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_1
c     b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨  b^{25, 24}_0
c  in DIMACS:
 14426 -14427  14428  575 -14429 0
 14426 -14427  14428  575 -14430 0
 14426 -14427  14428  575  14431 0

c  1-1 --> 0
c    (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0 ∧ -p_575) -> (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧ -b^{25, 24}_0)
c  in CNF:
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_2
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_1
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_0
c  in DIMACS:
 14426  14427 -14428  575 -14429 0
 14426  14427 -14428  575 -14430 0
 14426  14427 -14428  575 -14431 0

c  0-1 --> -1
c    (-b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧ -p_575) -> ( b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0)
c  in CNF:
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨  b^{25, 24}_2
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_1
c     b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨  b^{25, 24}_0
c  in DIMACS:
 14426  14427  14428  575  14429 0
 14426  14427  14428  575 -14430 0
 14426  14427  14428  575  14431 0

c  -1-1 --> -2
c    ( b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧  b^{25, 23}_0 ∧ -p_575) -> ( b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0)
c  in CNF:
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨  b^{25, 24}_2
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨  b^{25, 24}_1
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨  p_575 ∨ -b^{25, 24}_0
c  in DIMACS:
-14426  14427 -14428  575  14429 0
-14426  14427 -14428  575  14430 0
-14426  14427 -14428  575 -14431 0

c  -2-1 --> break 
c    ( b^{25, 23}_2 ∧  b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧ -p_575) -> break
c  in CNF:
c    -b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨  b^{25, 23}_0 ∨  p_575 ∨ break
c  in DIMACS:
-14426 -14427  14428  575 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 23}_2 ∧ -b^{25, 23}_1 ∧ -b^{25, 23}_0 ∧ true) 
c  in CNF:
c    -b^{25, 23}_2 ∨  b^{25, 23}_1 ∨  b^{25, 23}_0 ∨ false 
c  in DIMACS:
-14426  14427  14428  0

c  3 does not represent an automaton state.
c    -(-b^{25, 23}_2 ∧  b^{25, 23}_1 ∧  b^{25, 23}_0 ∧ true) 
c  in CNF:
c     b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ false 
c  in DIMACS:
 14426 -14427 -14428  0
c  -3 does not represent an automaton state.
c    -( b^{25, 23}_2 ∧  b^{25, 23}_1 ∧  b^{25, 23}_0 ∧ true) 
c  in CNF:
c    -b^{25, 23}_2 ∨ -b^{25, 23}_1 ∨ -b^{25, 23}_0 ∨ false 
c  in DIMACS:
-14426 -14427 -14428  0

c i = 24
c  -2+1 --> -1
c    ( b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧  p_600) -> ( b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0)
c  in CNF:
c    -b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨  b^{25, 25}_2
c    -b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_1
c    -b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨  b^{25, 25}_0
c  in DIMACS:
-14429 -14430  14431 -600  14432 0
-14429 -14430  14431 -600 -14433 0
-14429 -14430  14431 -600  14434 0

c  -1+1 --> 0
c    ( b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0 ∧  p_600) -> (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧ -b^{25, 25}_0)
c  in CNF:
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_2
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_1
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_0
c  in DIMACS:
-14429  14430 -14431 -600 -14432 0
-14429  14430 -14431 -600 -14433 0
-14429  14430 -14431 -600 -14434 0

c  0+1 --> 1
c    (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧  p_600) -> (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0)
c  in CNF:
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_2
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_1
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨  b^{25, 25}_0
c  in DIMACS:
 14429  14430  14431 -600 -14432 0
 14429  14430  14431 -600 -14433 0
 14429  14430  14431 -600  14434 0

c  1+1 --> 2
c    (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0 ∧  p_600) -> (-b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0)
c  in CNF:
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_2
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨  b^{25, 25}_1
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ -p_600 ∨ -b^{25, 25}_0
c  in DIMACS:
 14429  14430 -14431 -600 -14432 0
 14429  14430 -14431 -600  14433 0
 14429  14430 -14431 -600 -14434 0

c  2+1 --> break 
c    (-b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧  p_600) -> break
c  in CNF:
c     b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 14429 -14430  14431 -600 1162 0


c  2-1 --> 1
c    (-b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧ -p_600) -> (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0)
c  in CNF:
c     b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_2
c     b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_1
c     b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨  b^{25, 25}_0
c  in DIMACS:
 14429 -14430  14431  600 -14432 0
 14429 -14430  14431  600 -14433 0
 14429 -14430  14431  600  14434 0

c  1-1 --> 0
c    (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0 ∧ -p_600) -> (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧ -b^{25, 25}_0)
c  in CNF:
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_2
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_1
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_0
c  in DIMACS:
 14429  14430 -14431  600 -14432 0
 14429  14430 -14431  600 -14433 0
 14429  14430 -14431  600 -14434 0

c  0-1 --> -1
c    (-b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧ -p_600) -> ( b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0)
c  in CNF:
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨  b^{25, 25}_2
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_1
c     b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨  b^{25, 25}_0
c  in DIMACS:
 14429  14430  14431  600  14432 0
 14429  14430  14431  600 -14433 0
 14429  14430  14431  600  14434 0

c  -1-1 --> -2
c    ( b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧  b^{25, 24}_0 ∧ -p_600) -> ( b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0)
c  in CNF:
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨  b^{25, 25}_2
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨  b^{25, 25}_1
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨  p_600 ∨ -b^{25, 25}_0
c  in DIMACS:
-14429  14430 -14431  600  14432 0
-14429  14430 -14431  600  14433 0
-14429  14430 -14431  600 -14434 0

c  -2-1 --> break 
c    ( b^{25, 24}_2 ∧  b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨  b^{25, 24}_0 ∨  p_600 ∨ break
c  in DIMACS:
-14429 -14430  14431  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 24}_2 ∧ -b^{25, 24}_1 ∧ -b^{25, 24}_0 ∧ true) 
c  in CNF:
c    -b^{25, 24}_2 ∨  b^{25, 24}_1 ∨  b^{25, 24}_0 ∨ false 
c  in DIMACS:
-14429  14430  14431  0

c  3 does not represent an automaton state.
c    -(-b^{25, 24}_2 ∧  b^{25, 24}_1 ∧  b^{25, 24}_0 ∧ true) 
c  in CNF:
c     b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ false 
c  in DIMACS:
 14429 -14430 -14431  0
c  -3 does not represent an automaton state.
c    -( b^{25, 24}_2 ∧  b^{25, 24}_1 ∧  b^{25, 24}_0 ∧ true) 
c  in CNF:
c    -b^{25, 24}_2 ∨ -b^{25, 24}_1 ∨ -b^{25, 24}_0 ∨ false 
c  in DIMACS:
-14429 -14430 -14431  0

c i = 25
c  -2+1 --> -1
c    ( b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧  p_625) -> ( b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0)
c  in CNF:
c    -b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨  b^{25, 26}_2
c    -b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_1
c    -b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨  b^{25, 26}_0
c  in DIMACS:
-14432 -14433  14434 -625  14435 0
-14432 -14433  14434 -625 -14436 0
-14432 -14433  14434 -625  14437 0

c  -1+1 --> 0
c    ( b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0 ∧  p_625) -> (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧ -b^{25, 26}_0)
c  in CNF:
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_2
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_1
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_0
c  in DIMACS:
-14432  14433 -14434 -625 -14435 0
-14432  14433 -14434 -625 -14436 0
-14432  14433 -14434 -625 -14437 0

c  0+1 --> 1
c    (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧  p_625) -> (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0)
c  in CNF:
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_2
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_1
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨  b^{25, 26}_0
c  in DIMACS:
 14432  14433  14434 -625 -14435 0
 14432  14433  14434 -625 -14436 0
 14432  14433  14434 -625  14437 0

c  1+1 --> 2
c    (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0 ∧  p_625) -> (-b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0)
c  in CNF:
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_2
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨  b^{25, 26}_1
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ -p_625 ∨ -b^{25, 26}_0
c  in DIMACS:
 14432  14433 -14434 -625 -14435 0
 14432  14433 -14434 -625  14436 0
 14432  14433 -14434 -625 -14437 0

c  2+1 --> break 
c    (-b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧  p_625) -> break
c  in CNF:
c     b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ -p_625 ∨ break
c  in DIMACS:
 14432 -14433  14434 -625 1162 0


c  2-1 --> 1
c    (-b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧ -p_625) -> (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0)
c  in CNF:
c     b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_2
c     b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_1
c     b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨  b^{25, 26}_0
c  in DIMACS:
 14432 -14433  14434  625 -14435 0
 14432 -14433  14434  625 -14436 0
 14432 -14433  14434  625  14437 0

c  1-1 --> 0
c    (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0 ∧ -p_625) -> (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧ -b^{25, 26}_0)
c  in CNF:
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_2
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_1
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_0
c  in DIMACS:
 14432  14433 -14434  625 -14435 0
 14432  14433 -14434  625 -14436 0
 14432  14433 -14434  625 -14437 0

c  0-1 --> -1
c    (-b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧ -p_625) -> ( b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0)
c  in CNF:
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨  b^{25, 26}_2
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_1
c     b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨  b^{25, 26}_0
c  in DIMACS:
 14432  14433  14434  625  14435 0
 14432  14433  14434  625 -14436 0
 14432  14433  14434  625  14437 0

c  -1-1 --> -2
c    ( b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧  b^{25, 25}_0 ∧ -p_625) -> ( b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0)
c  in CNF:
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨  b^{25, 26}_2
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨  b^{25, 26}_1
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨  p_625 ∨ -b^{25, 26}_0
c  in DIMACS:
-14432  14433 -14434  625  14435 0
-14432  14433 -14434  625  14436 0
-14432  14433 -14434  625 -14437 0

c  -2-1 --> break 
c    ( b^{25, 25}_2 ∧  b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧ -p_625) -> break
c  in CNF:
c    -b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨  b^{25, 25}_0 ∨  p_625 ∨ break
c  in DIMACS:
-14432 -14433  14434  625 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 25}_2 ∧ -b^{25, 25}_1 ∧ -b^{25, 25}_0 ∧ true) 
c  in CNF:
c    -b^{25, 25}_2 ∨  b^{25, 25}_1 ∨  b^{25, 25}_0 ∨ false 
c  in DIMACS:
-14432  14433  14434  0

c  3 does not represent an automaton state.
c    -(-b^{25, 25}_2 ∧  b^{25, 25}_1 ∧  b^{25, 25}_0 ∧ true) 
c  in CNF:
c     b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ false 
c  in DIMACS:
 14432 -14433 -14434  0
c  -3 does not represent an automaton state.
c    -( b^{25, 25}_2 ∧  b^{25, 25}_1 ∧  b^{25, 25}_0 ∧ true) 
c  in CNF:
c    -b^{25, 25}_2 ∨ -b^{25, 25}_1 ∨ -b^{25, 25}_0 ∨ false 
c  in DIMACS:
-14432 -14433 -14434  0

c i = 26
c  -2+1 --> -1
c    ( b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧  p_650) -> ( b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0)
c  in CNF:
c    -b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨  b^{25, 27}_2
c    -b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_1
c    -b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨  b^{25, 27}_0
c  in DIMACS:
-14435 -14436  14437 -650  14438 0
-14435 -14436  14437 -650 -14439 0
-14435 -14436  14437 -650  14440 0

c  -1+1 --> 0
c    ( b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0 ∧  p_650) -> (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧ -b^{25, 27}_0)
c  in CNF:
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_2
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_1
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_0
c  in DIMACS:
-14435  14436 -14437 -650 -14438 0
-14435  14436 -14437 -650 -14439 0
-14435  14436 -14437 -650 -14440 0

c  0+1 --> 1
c    (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧  p_650) -> (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0)
c  in CNF:
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_2
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_1
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨  b^{25, 27}_0
c  in DIMACS:
 14435  14436  14437 -650 -14438 0
 14435  14436  14437 -650 -14439 0
 14435  14436  14437 -650  14440 0

c  1+1 --> 2
c    (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0 ∧  p_650) -> (-b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0)
c  in CNF:
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_2
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨  b^{25, 27}_1
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ -p_650 ∨ -b^{25, 27}_0
c  in DIMACS:
 14435  14436 -14437 -650 -14438 0
 14435  14436 -14437 -650  14439 0
 14435  14436 -14437 -650 -14440 0

c  2+1 --> break 
c    (-b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧  p_650) -> break
c  in CNF:
c     b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 14435 -14436  14437 -650 1162 0


c  2-1 --> 1
c    (-b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧ -p_650) -> (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0)
c  in CNF:
c     b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_2
c     b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_1
c     b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨  b^{25, 27}_0
c  in DIMACS:
 14435 -14436  14437  650 -14438 0
 14435 -14436  14437  650 -14439 0
 14435 -14436  14437  650  14440 0

c  1-1 --> 0
c    (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0 ∧ -p_650) -> (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧ -b^{25, 27}_0)
c  in CNF:
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_2
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_1
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_0
c  in DIMACS:
 14435  14436 -14437  650 -14438 0
 14435  14436 -14437  650 -14439 0
 14435  14436 -14437  650 -14440 0

c  0-1 --> -1
c    (-b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧ -p_650) -> ( b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0)
c  in CNF:
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨  b^{25, 27}_2
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_1
c     b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨  b^{25, 27}_0
c  in DIMACS:
 14435  14436  14437  650  14438 0
 14435  14436  14437  650 -14439 0
 14435  14436  14437  650  14440 0

c  -1-1 --> -2
c    ( b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧  b^{25, 26}_0 ∧ -p_650) -> ( b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0)
c  in CNF:
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨  b^{25, 27}_2
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨  b^{25, 27}_1
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨  p_650 ∨ -b^{25, 27}_0
c  in DIMACS:
-14435  14436 -14437  650  14438 0
-14435  14436 -14437  650  14439 0
-14435  14436 -14437  650 -14440 0

c  -2-1 --> break 
c    ( b^{25, 26}_2 ∧  b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨  b^{25, 26}_0 ∨  p_650 ∨ break
c  in DIMACS:
-14435 -14436  14437  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 26}_2 ∧ -b^{25, 26}_1 ∧ -b^{25, 26}_0 ∧ true) 
c  in CNF:
c    -b^{25, 26}_2 ∨  b^{25, 26}_1 ∨  b^{25, 26}_0 ∨ false 
c  in DIMACS:
-14435  14436  14437  0

c  3 does not represent an automaton state.
c    -(-b^{25, 26}_2 ∧  b^{25, 26}_1 ∧  b^{25, 26}_0 ∧ true) 
c  in CNF:
c     b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ false 
c  in DIMACS:
 14435 -14436 -14437  0
c  -3 does not represent an automaton state.
c    -( b^{25, 26}_2 ∧  b^{25, 26}_1 ∧  b^{25, 26}_0 ∧ true) 
c  in CNF:
c    -b^{25, 26}_2 ∨ -b^{25, 26}_1 ∨ -b^{25, 26}_0 ∨ false 
c  in DIMACS:
-14435 -14436 -14437  0

c i = 27
c  -2+1 --> -1
c    ( b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧  p_675) -> ( b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0)
c  in CNF:
c    -b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨  b^{25, 28}_2
c    -b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_1
c    -b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨  b^{25, 28}_0
c  in DIMACS:
-14438 -14439  14440 -675  14441 0
-14438 -14439  14440 -675 -14442 0
-14438 -14439  14440 -675  14443 0

c  -1+1 --> 0
c    ( b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0 ∧  p_675) -> (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧ -b^{25, 28}_0)
c  in CNF:
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_2
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_1
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_0
c  in DIMACS:
-14438  14439 -14440 -675 -14441 0
-14438  14439 -14440 -675 -14442 0
-14438  14439 -14440 -675 -14443 0

c  0+1 --> 1
c    (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧  p_675) -> (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0)
c  in CNF:
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_2
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_1
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨  b^{25, 28}_0
c  in DIMACS:
 14438  14439  14440 -675 -14441 0
 14438  14439  14440 -675 -14442 0
 14438  14439  14440 -675  14443 0

c  1+1 --> 2
c    (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0 ∧  p_675) -> (-b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0)
c  in CNF:
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_2
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨  b^{25, 28}_1
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ -p_675 ∨ -b^{25, 28}_0
c  in DIMACS:
 14438  14439 -14440 -675 -14441 0
 14438  14439 -14440 -675  14442 0
 14438  14439 -14440 -675 -14443 0

c  2+1 --> break 
c    (-b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧  p_675) -> break
c  in CNF:
c     b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 14438 -14439  14440 -675 1162 0


c  2-1 --> 1
c    (-b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧ -p_675) -> (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0)
c  in CNF:
c     b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_2
c     b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_1
c     b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨  b^{25, 28}_0
c  in DIMACS:
 14438 -14439  14440  675 -14441 0
 14438 -14439  14440  675 -14442 0
 14438 -14439  14440  675  14443 0

c  1-1 --> 0
c    (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0 ∧ -p_675) -> (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧ -b^{25, 28}_0)
c  in CNF:
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_2
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_1
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_0
c  in DIMACS:
 14438  14439 -14440  675 -14441 0
 14438  14439 -14440  675 -14442 0
 14438  14439 -14440  675 -14443 0

c  0-1 --> -1
c    (-b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧ -p_675) -> ( b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0)
c  in CNF:
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨  b^{25, 28}_2
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_1
c     b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨  b^{25, 28}_0
c  in DIMACS:
 14438  14439  14440  675  14441 0
 14438  14439  14440  675 -14442 0
 14438  14439  14440  675  14443 0

c  -1-1 --> -2
c    ( b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧  b^{25, 27}_0 ∧ -p_675) -> ( b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0)
c  in CNF:
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨  b^{25, 28}_2
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨  b^{25, 28}_1
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨  p_675 ∨ -b^{25, 28}_0
c  in DIMACS:
-14438  14439 -14440  675  14441 0
-14438  14439 -14440  675  14442 0
-14438  14439 -14440  675 -14443 0

c  -2-1 --> break 
c    ( b^{25, 27}_2 ∧  b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨  b^{25, 27}_0 ∨  p_675 ∨ break
c  in DIMACS:
-14438 -14439  14440  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 27}_2 ∧ -b^{25, 27}_1 ∧ -b^{25, 27}_0 ∧ true) 
c  in CNF:
c    -b^{25, 27}_2 ∨  b^{25, 27}_1 ∨  b^{25, 27}_0 ∨ false 
c  in DIMACS:
-14438  14439  14440  0

c  3 does not represent an automaton state.
c    -(-b^{25, 27}_2 ∧  b^{25, 27}_1 ∧  b^{25, 27}_0 ∧ true) 
c  in CNF:
c     b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ false 
c  in DIMACS:
 14438 -14439 -14440  0
c  -3 does not represent an automaton state.
c    -( b^{25, 27}_2 ∧  b^{25, 27}_1 ∧  b^{25, 27}_0 ∧ true) 
c  in CNF:
c    -b^{25, 27}_2 ∨ -b^{25, 27}_1 ∨ -b^{25, 27}_0 ∨ false 
c  in DIMACS:
-14438 -14439 -14440  0

c i = 28
c  -2+1 --> -1
c    ( b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧  p_700) -> ( b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0)
c  in CNF:
c    -b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨  b^{25, 29}_2
c    -b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_1
c    -b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨  b^{25, 29}_0
c  in DIMACS:
-14441 -14442  14443 -700  14444 0
-14441 -14442  14443 -700 -14445 0
-14441 -14442  14443 -700  14446 0

c  -1+1 --> 0
c    ( b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0 ∧  p_700) -> (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧ -b^{25, 29}_0)
c  in CNF:
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_2
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_1
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_0
c  in DIMACS:
-14441  14442 -14443 -700 -14444 0
-14441  14442 -14443 -700 -14445 0
-14441  14442 -14443 -700 -14446 0

c  0+1 --> 1
c    (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧  p_700) -> (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0)
c  in CNF:
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_2
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_1
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨  b^{25, 29}_0
c  in DIMACS:
 14441  14442  14443 -700 -14444 0
 14441  14442  14443 -700 -14445 0
 14441  14442  14443 -700  14446 0

c  1+1 --> 2
c    (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0 ∧  p_700) -> (-b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0)
c  in CNF:
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_2
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨  b^{25, 29}_1
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ -p_700 ∨ -b^{25, 29}_0
c  in DIMACS:
 14441  14442 -14443 -700 -14444 0
 14441  14442 -14443 -700  14445 0
 14441  14442 -14443 -700 -14446 0

c  2+1 --> break 
c    (-b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧  p_700) -> break
c  in CNF:
c     b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 14441 -14442  14443 -700 1162 0


c  2-1 --> 1
c    (-b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧ -p_700) -> (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0)
c  in CNF:
c     b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_2
c     b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_1
c     b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨  b^{25, 29}_0
c  in DIMACS:
 14441 -14442  14443  700 -14444 0
 14441 -14442  14443  700 -14445 0
 14441 -14442  14443  700  14446 0

c  1-1 --> 0
c    (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0 ∧ -p_700) -> (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧ -b^{25, 29}_0)
c  in CNF:
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_2
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_1
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_0
c  in DIMACS:
 14441  14442 -14443  700 -14444 0
 14441  14442 -14443  700 -14445 0
 14441  14442 -14443  700 -14446 0

c  0-1 --> -1
c    (-b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧ -p_700) -> ( b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0)
c  in CNF:
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨  b^{25, 29}_2
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_1
c     b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨  b^{25, 29}_0
c  in DIMACS:
 14441  14442  14443  700  14444 0
 14441  14442  14443  700 -14445 0
 14441  14442  14443  700  14446 0

c  -1-1 --> -2
c    ( b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧  b^{25, 28}_0 ∧ -p_700) -> ( b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0)
c  in CNF:
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨  b^{25, 29}_2
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨  b^{25, 29}_1
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨  p_700 ∨ -b^{25, 29}_0
c  in DIMACS:
-14441  14442 -14443  700  14444 0
-14441  14442 -14443  700  14445 0
-14441  14442 -14443  700 -14446 0

c  -2-1 --> break 
c    ( b^{25, 28}_2 ∧  b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨  b^{25, 28}_0 ∨  p_700 ∨ break
c  in DIMACS:
-14441 -14442  14443  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 28}_2 ∧ -b^{25, 28}_1 ∧ -b^{25, 28}_0 ∧ true) 
c  in CNF:
c    -b^{25, 28}_2 ∨  b^{25, 28}_1 ∨  b^{25, 28}_0 ∨ false 
c  in DIMACS:
-14441  14442  14443  0

c  3 does not represent an automaton state.
c    -(-b^{25, 28}_2 ∧  b^{25, 28}_1 ∧  b^{25, 28}_0 ∧ true) 
c  in CNF:
c     b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ false 
c  in DIMACS:
 14441 -14442 -14443  0
c  -3 does not represent an automaton state.
c    -( b^{25, 28}_2 ∧  b^{25, 28}_1 ∧  b^{25, 28}_0 ∧ true) 
c  in CNF:
c    -b^{25, 28}_2 ∨ -b^{25, 28}_1 ∨ -b^{25, 28}_0 ∨ false 
c  in DIMACS:
-14441 -14442 -14443  0

c i = 29
c  -2+1 --> -1
c    ( b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧  p_725) -> ( b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0)
c  in CNF:
c    -b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨  b^{25, 30}_2
c    -b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_1
c    -b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨  b^{25, 30}_0
c  in DIMACS:
-14444 -14445  14446 -725  14447 0
-14444 -14445  14446 -725 -14448 0
-14444 -14445  14446 -725  14449 0

c  -1+1 --> 0
c    ( b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0 ∧  p_725) -> (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧ -b^{25, 30}_0)
c  in CNF:
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_2
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_1
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_0
c  in DIMACS:
-14444  14445 -14446 -725 -14447 0
-14444  14445 -14446 -725 -14448 0
-14444  14445 -14446 -725 -14449 0

c  0+1 --> 1
c    (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧  p_725) -> (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0)
c  in CNF:
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_2
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_1
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨  b^{25, 30}_0
c  in DIMACS:
 14444  14445  14446 -725 -14447 0
 14444  14445  14446 -725 -14448 0
 14444  14445  14446 -725  14449 0

c  1+1 --> 2
c    (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0 ∧  p_725) -> (-b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0)
c  in CNF:
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_2
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨  b^{25, 30}_1
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ -p_725 ∨ -b^{25, 30}_0
c  in DIMACS:
 14444  14445 -14446 -725 -14447 0
 14444  14445 -14446 -725  14448 0
 14444  14445 -14446 -725 -14449 0

c  2+1 --> break 
c    (-b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧  p_725) -> break
c  in CNF:
c     b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ -p_725 ∨ break
c  in DIMACS:
 14444 -14445  14446 -725 1162 0


c  2-1 --> 1
c    (-b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧ -p_725) -> (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0)
c  in CNF:
c     b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_2
c     b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_1
c     b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨  b^{25, 30}_0
c  in DIMACS:
 14444 -14445  14446  725 -14447 0
 14444 -14445  14446  725 -14448 0
 14444 -14445  14446  725  14449 0

c  1-1 --> 0
c    (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0 ∧ -p_725) -> (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧ -b^{25, 30}_0)
c  in CNF:
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_2
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_1
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_0
c  in DIMACS:
 14444  14445 -14446  725 -14447 0
 14444  14445 -14446  725 -14448 0
 14444  14445 -14446  725 -14449 0

c  0-1 --> -1
c    (-b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧ -p_725) -> ( b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0)
c  in CNF:
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨  b^{25, 30}_2
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_1
c     b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨  b^{25, 30}_0
c  in DIMACS:
 14444  14445  14446  725  14447 0
 14444  14445  14446  725 -14448 0
 14444  14445  14446  725  14449 0

c  -1-1 --> -2
c    ( b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧  b^{25, 29}_0 ∧ -p_725) -> ( b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0)
c  in CNF:
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨  b^{25, 30}_2
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨  b^{25, 30}_1
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨  p_725 ∨ -b^{25, 30}_0
c  in DIMACS:
-14444  14445 -14446  725  14447 0
-14444  14445 -14446  725  14448 0
-14444  14445 -14446  725 -14449 0

c  -2-1 --> break 
c    ( b^{25, 29}_2 ∧  b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧ -p_725) -> break
c  in CNF:
c    -b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨  b^{25, 29}_0 ∨  p_725 ∨ break
c  in DIMACS:
-14444 -14445  14446  725 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 29}_2 ∧ -b^{25, 29}_1 ∧ -b^{25, 29}_0 ∧ true) 
c  in CNF:
c    -b^{25, 29}_2 ∨  b^{25, 29}_1 ∨  b^{25, 29}_0 ∨ false 
c  in DIMACS:
-14444  14445  14446  0

c  3 does not represent an automaton state.
c    -(-b^{25, 29}_2 ∧  b^{25, 29}_1 ∧  b^{25, 29}_0 ∧ true) 
c  in CNF:
c     b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ false 
c  in DIMACS:
 14444 -14445 -14446  0
c  -3 does not represent an automaton state.
c    -( b^{25, 29}_2 ∧  b^{25, 29}_1 ∧  b^{25, 29}_0 ∧ true) 
c  in CNF:
c    -b^{25, 29}_2 ∨ -b^{25, 29}_1 ∨ -b^{25, 29}_0 ∨ false 
c  in DIMACS:
-14444 -14445 -14446  0

c i = 30
c  -2+1 --> -1
c    ( b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧  p_750) -> ( b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0)
c  in CNF:
c    -b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨  b^{25, 31}_2
c    -b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_1
c    -b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨  b^{25, 31}_0
c  in DIMACS:
-14447 -14448  14449 -750  14450 0
-14447 -14448  14449 -750 -14451 0
-14447 -14448  14449 -750  14452 0

c  -1+1 --> 0
c    ( b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0 ∧  p_750) -> (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧ -b^{25, 31}_0)
c  in CNF:
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_2
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_1
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_0
c  in DIMACS:
-14447  14448 -14449 -750 -14450 0
-14447  14448 -14449 -750 -14451 0
-14447  14448 -14449 -750 -14452 0

c  0+1 --> 1
c    (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧  p_750) -> (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0)
c  in CNF:
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_2
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_1
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨  b^{25, 31}_0
c  in DIMACS:
 14447  14448  14449 -750 -14450 0
 14447  14448  14449 -750 -14451 0
 14447  14448  14449 -750  14452 0

c  1+1 --> 2
c    (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0 ∧  p_750) -> (-b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0)
c  in CNF:
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_2
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨  b^{25, 31}_1
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ -p_750 ∨ -b^{25, 31}_0
c  in DIMACS:
 14447  14448 -14449 -750 -14450 0
 14447  14448 -14449 -750  14451 0
 14447  14448 -14449 -750 -14452 0

c  2+1 --> break 
c    (-b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧  p_750) -> break
c  in CNF:
c     b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 14447 -14448  14449 -750 1162 0


c  2-1 --> 1
c    (-b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧ -p_750) -> (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0)
c  in CNF:
c     b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_2
c     b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_1
c     b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨  b^{25, 31}_0
c  in DIMACS:
 14447 -14448  14449  750 -14450 0
 14447 -14448  14449  750 -14451 0
 14447 -14448  14449  750  14452 0

c  1-1 --> 0
c    (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0 ∧ -p_750) -> (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧ -b^{25, 31}_0)
c  in CNF:
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_2
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_1
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_0
c  in DIMACS:
 14447  14448 -14449  750 -14450 0
 14447  14448 -14449  750 -14451 0
 14447  14448 -14449  750 -14452 0

c  0-1 --> -1
c    (-b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧ -p_750) -> ( b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0)
c  in CNF:
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨  b^{25, 31}_2
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_1
c     b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨  b^{25, 31}_0
c  in DIMACS:
 14447  14448  14449  750  14450 0
 14447  14448  14449  750 -14451 0
 14447  14448  14449  750  14452 0

c  -1-1 --> -2
c    ( b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧  b^{25, 30}_0 ∧ -p_750) -> ( b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0)
c  in CNF:
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨  b^{25, 31}_2
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨  b^{25, 31}_1
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨  p_750 ∨ -b^{25, 31}_0
c  in DIMACS:
-14447  14448 -14449  750  14450 0
-14447  14448 -14449  750  14451 0
-14447  14448 -14449  750 -14452 0

c  -2-1 --> break 
c    ( b^{25, 30}_2 ∧  b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨  b^{25, 30}_0 ∨  p_750 ∨ break
c  in DIMACS:
-14447 -14448  14449  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 30}_2 ∧ -b^{25, 30}_1 ∧ -b^{25, 30}_0 ∧ true) 
c  in CNF:
c    -b^{25, 30}_2 ∨  b^{25, 30}_1 ∨  b^{25, 30}_0 ∨ false 
c  in DIMACS:
-14447  14448  14449  0

c  3 does not represent an automaton state.
c    -(-b^{25, 30}_2 ∧  b^{25, 30}_1 ∧  b^{25, 30}_0 ∧ true) 
c  in CNF:
c     b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ false 
c  in DIMACS:
 14447 -14448 -14449  0
c  -3 does not represent an automaton state.
c    -( b^{25, 30}_2 ∧  b^{25, 30}_1 ∧  b^{25, 30}_0 ∧ true) 
c  in CNF:
c    -b^{25, 30}_2 ∨ -b^{25, 30}_1 ∨ -b^{25, 30}_0 ∨ false 
c  in DIMACS:
-14447 -14448 -14449  0

c i = 31
c  -2+1 --> -1
c    ( b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧  p_775) -> ( b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0)
c  in CNF:
c    -b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨  b^{25, 32}_2
c    -b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_1
c    -b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨  b^{25, 32}_0
c  in DIMACS:
-14450 -14451  14452 -775  14453 0
-14450 -14451  14452 -775 -14454 0
-14450 -14451  14452 -775  14455 0

c  -1+1 --> 0
c    ( b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0 ∧  p_775) -> (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧ -b^{25, 32}_0)
c  in CNF:
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_2
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_1
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_0
c  in DIMACS:
-14450  14451 -14452 -775 -14453 0
-14450  14451 -14452 -775 -14454 0
-14450  14451 -14452 -775 -14455 0

c  0+1 --> 1
c    (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧  p_775) -> (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0)
c  in CNF:
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_2
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_1
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨  b^{25, 32}_0
c  in DIMACS:
 14450  14451  14452 -775 -14453 0
 14450  14451  14452 -775 -14454 0
 14450  14451  14452 -775  14455 0

c  1+1 --> 2
c    (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0 ∧  p_775) -> (-b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0)
c  in CNF:
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_2
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨  b^{25, 32}_1
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ -p_775 ∨ -b^{25, 32}_0
c  in DIMACS:
 14450  14451 -14452 -775 -14453 0
 14450  14451 -14452 -775  14454 0
 14450  14451 -14452 -775 -14455 0

c  2+1 --> break 
c    (-b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧  p_775) -> break
c  in CNF:
c     b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ -p_775 ∨ break
c  in DIMACS:
 14450 -14451  14452 -775 1162 0


c  2-1 --> 1
c    (-b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧ -p_775) -> (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0)
c  in CNF:
c     b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_2
c     b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_1
c     b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨  b^{25, 32}_0
c  in DIMACS:
 14450 -14451  14452  775 -14453 0
 14450 -14451  14452  775 -14454 0
 14450 -14451  14452  775  14455 0

c  1-1 --> 0
c    (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0 ∧ -p_775) -> (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧ -b^{25, 32}_0)
c  in CNF:
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_2
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_1
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_0
c  in DIMACS:
 14450  14451 -14452  775 -14453 0
 14450  14451 -14452  775 -14454 0
 14450  14451 -14452  775 -14455 0

c  0-1 --> -1
c    (-b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧ -p_775) -> ( b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0)
c  in CNF:
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨  b^{25, 32}_2
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_1
c     b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨  b^{25, 32}_0
c  in DIMACS:
 14450  14451  14452  775  14453 0
 14450  14451  14452  775 -14454 0
 14450  14451  14452  775  14455 0

c  -1-1 --> -2
c    ( b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧  b^{25, 31}_0 ∧ -p_775) -> ( b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0)
c  in CNF:
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨  b^{25, 32}_2
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨  b^{25, 32}_1
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨  p_775 ∨ -b^{25, 32}_0
c  in DIMACS:
-14450  14451 -14452  775  14453 0
-14450  14451 -14452  775  14454 0
-14450  14451 -14452  775 -14455 0

c  -2-1 --> break 
c    ( b^{25, 31}_2 ∧  b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧ -p_775) -> break
c  in CNF:
c    -b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨  b^{25, 31}_0 ∨  p_775 ∨ break
c  in DIMACS:
-14450 -14451  14452  775 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 31}_2 ∧ -b^{25, 31}_1 ∧ -b^{25, 31}_0 ∧ true) 
c  in CNF:
c    -b^{25, 31}_2 ∨  b^{25, 31}_1 ∨  b^{25, 31}_0 ∨ false 
c  in DIMACS:
-14450  14451  14452  0

c  3 does not represent an automaton state.
c    -(-b^{25, 31}_2 ∧  b^{25, 31}_1 ∧  b^{25, 31}_0 ∧ true) 
c  in CNF:
c     b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ false 
c  in DIMACS:
 14450 -14451 -14452  0
c  -3 does not represent an automaton state.
c    -( b^{25, 31}_2 ∧  b^{25, 31}_1 ∧  b^{25, 31}_0 ∧ true) 
c  in CNF:
c    -b^{25, 31}_2 ∨ -b^{25, 31}_1 ∨ -b^{25, 31}_0 ∨ false 
c  in DIMACS:
-14450 -14451 -14452  0

c i = 32
c  -2+1 --> -1
c    ( b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧  p_800) -> ( b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0)
c  in CNF:
c    -b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨  b^{25, 33}_2
c    -b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_1
c    -b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨  b^{25, 33}_0
c  in DIMACS:
-14453 -14454  14455 -800  14456 0
-14453 -14454  14455 -800 -14457 0
-14453 -14454  14455 -800  14458 0

c  -1+1 --> 0
c    ( b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0 ∧  p_800) -> (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧ -b^{25, 33}_0)
c  in CNF:
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_2
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_1
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_0
c  in DIMACS:
-14453  14454 -14455 -800 -14456 0
-14453  14454 -14455 -800 -14457 0
-14453  14454 -14455 -800 -14458 0

c  0+1 --> 1
c    (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧  p_800) -> (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0)
c  in CNF:
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_2
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_1
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨  b^{25, 33}_0
c  in DIMACS:
 14453  14454  14455 -800 -14456 0
 14453  14454  14455 -800 -14457 0
 14453  14454  14455 -800  14458 0

c  1+1 --> 2
c    (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0 ∧  p_800) -> (-b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0)
c  in CNF:
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_2
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨  b^{25, 33}_1
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ -p_800 ∨ -b^{25, 33}_0
c  in DIMACS:
 14453  14454 -14455 -800 -14456 0
 14453  14454 -14455 -800  14457 0
 14453  14454 -14455 -800 -14458 0

c  2+1 --> break 
c    (-b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧  p_800) -> break
c  in CNF:
c     b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 14453 -14454  14455 -800 1162 0


c  2-1 --> 1
c    (-b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧ -p_800) -> (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0)
c  in CNF:
c     b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_2
c     b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_1
c     b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨  b^{25, 33}_0
c  in DIMACS:
 14453 -14454  14455  800 -14456 0
 14453 -14454  14455  800 -14457 0
 14453 -14454  14455  800  14458 0

c  1-1 --> 0
c    (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0 ∧ -p_800) -> (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧ -b^{25, 33}_0)
c  in CNF:
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_2
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_1
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_0
c  in DIMACS:
 14453  14454 -14455  800 -14456 0
 14453  14454 -14455  800 -14457 0
 14453  14454 -14455  800 -14458 0

c  0-1 --> -1
c    (-b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧ -p_800) -> ( b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0)
c  in CNF:
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨  b^{25, 33}_2
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_1
c     b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨  b^{25, 33}_0
c  in DIMACS:
 14453  14454  14455  800  14456 0
 14453  14454  14455  800 -14457 0
 14453  14454  14455  800  14458 0

c  -1-1 --> -2
c    ( b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧  b^{25, 32}_0 ∧ -p_800) -> ( b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0)
c  in CNF:
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨  b^{25, 33}_2
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨  b^{25, 33}_1
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨  p_800 ∨ -b^{25, 33}_0
c  in DIMACS:
-14453  14454 -14455  800  14456 0
-14453  14454 -14455  800  14457 0
-14453  14454 -14455  800 -14458 0

c  -2-1 --> break 
c    ( b^{25, 32}_2 ∧  b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨  b^{25, 32}_0 ∨  p_800 ∨ break
c  in DIMACS:
-14453 -14454  14455  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 32}_2 ∧ -b^{25, 32}_1 ∧ -b^{25, 32}_0 ∧ true) 
c  in CNF:
c    -b^{25, 32}_2 ∨  b^{25, 32}_1 ∨  b^{25, 32}_0 ∨ false 
c  in DIMACS:
-14453  14454  14455  0

c  3 does not represent an automaton state.
c    -(-b^{25, 32}_2 ∧  b^{25, 32}_1 ∧  b^{25, 32}_0 ∧ true) 
c  in CNF:
c     b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ false 
c  in DIMACS:
 14453 -14454 -14455  0
c  -3 does not represent an automaton state.
c    -( b^{25, 32}_2 ∧  b^{25, 32}_1 ∧  b^{25, 32}_0 ∧ true) 
c  in CNF:
c    -b^{25, 32}_2 ∨ -b^{25, 32}_1 ∨ -b^{25, 32}_0 ∨ false 
c  in DIMACS:
-14453 -14454 -14455  0

c i = 33
c  -2+1 --> -1
c    ( b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧  p_825) -> ( b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0)
c  in CNF:
c    -b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨  b^{25, 34}_2
c    -b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_1
c    -b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨  b^{25, 34}_0
c  in DIMACS:
-14456 -14457  14458 -825  14459 0
-14456 -14457  14458 -825 -14460 0
-14456 -14457  14458 -825  14461 0

c  -1+1 --> 0
c    ( b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0 ∧  p_825) -> (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧ -b^{25, 34}_0)
c  in CNF:
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_2
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_1
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_0
c  in DIMACS:
-14456  14457 -14458 -825 -14459 0
-14456  14457 -14458 -825 -14460 0
-14456  14457 -14458 -825 -14461 0

c  0+1 --> 1
c    (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧  p_825) -> (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0)
c  in CNF:
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_2
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_1
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨  b^{25, 34}_0
c  in DIMACS:
 14456  14457  14458 -825 -14459 0
 14456  14457  14458 -825 -14460 0
 14456  14457  14458 -825  14461 0

c  1+1 --> 2
c    (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0 ∧  p_825) -> (-b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0)
c  in CNF:
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_2
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨  b^{25, 34}_1
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ -p_825 ∨ -b^{25, 34}_0
c  in DIMACS:
 14456  14457 -14458 -825 -14459 0
 14456  14457 -14458 -825  14460 0
 14456  14457 -14458 -825 -14461 0

c  2+1 --> break 
c    (-b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧  p_825) -> break
c  in CNF:
c     b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 14456 -14457  14458 -825 1162 0


c  2-1 --> 1
c    (-b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧ -p_825) -> (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0)
c  in CNF:
c     b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_2
c     b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_1
c     b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨  b^{25, 34}_0
c  in DIMACS:
 14456 -14457  14458  825 -14459 0
 14456 -14457  14458  825 -14460 0
 14456 -14457  14458  825  14461 0

c  1-1 --> 0
c    (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0 ∧ -p_825) -> (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧ -b^{25, 34}_0)
c  in CNF:
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_2
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_1
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_0
c  in DIMACS:
 14456  14457 -14458  825 -14459 0
 14456  14457 -14458  825 -14460 0
 14456  14457 -14458  825 -14461 0

c  0-1 --> -1
c    (-b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧ -p_825) -> ( b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0)
c  in CNF:
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨  b^{25, 34}_2
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_1
c     b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨  b^{25, 34}_0
c  in DIMACS:
 14456  14457  14458  825  14459 0
 14456  14457  14458  825 -14460 0
 14456  14457  14458  825  14461 0

c  -1-1 --> -2
c    ( b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧  b^{25, 33}_0 ∧ -p_825) -> ( b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0)
c  in CNF:
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨  b^{25, 34}_2
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨  b^{25, 34}_1
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨  p_825 ∨ -b^{25, 34}_0
c  in DIMACS:
-14456  14457 -14458  825  14459 0
-14456  14457 -14458  825  14460 0
-14456  14457 -14458  825 -14461 0

c  -2-1 --> break 
c    ( b^{25, 33}_2 ∧  b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨  b^{25, 33}_0 ∨  p_825 ∨ break
c  in DIMACS:
-14456 -14457  14458  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 33}_2 ∧ -b^{25, 33}_1 ∧ -b^{25, 33}_0 ∧ true) 
c  in CNF:
c    -b^{25, 33}_2 ∨  b^{25, 33}_1 ∨  b^{25, 33}_0 ∨ false 
c  in DIMACS:
-14456  14457  14458  0

c  3 does not represent an automaton state.
c    -(-b^{25, 33}_2 ∧  b^{25, 33}_1 ∧  b^{25, 33}_0 ∧ true) 
c  in CNF:
c     b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ false 
c  in DIMACS:
 14456 -14457 -14458  0
c  -3 does not represent an automaton state.
c    -( b^{25, 33}_2 ∧  b^{25, 33}_1 ∧  b^{25, 33}_0 ∧ true) 
c  in CNF:
c    -b^{25, 33}_2 ∨ -b^{25, 33}_1 ∨ -b^{25, 33}_0 ∨ false 
c  in DIMACS:
-14456 -14457 -14458  0

c i = 34
c  -2+1 --> -1
c    ( b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧  p_850) -> ( b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0)
c  in CNF:
c    -b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨  b^{25, 35}_2
c    -b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_1
c    -b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨  b^{25, 35}_0
c  in DIMACS:
-14459 -14460  14461 -850  14462 0
-14459 -14460  14461 -850 -14463 0
-14459 -14460  14461 -850  14464 0

c  -1+1 --> 0
c    ( b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0 ∧  p_850) -> (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧ -b^{25, 35}_0)
c  in CNF:
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_2
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_1
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_0
c  in DIMACS:
-14459  14460 -14461 -850 -14462 0
-14459  14460 -14461 -850 -14463 0
-14459  14460 -14461 -850 -14464 0

c  0+1 --> 1
c    (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧  p_850) -> (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0)
c  in CNF:
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_2
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_1
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨  b^{25, 35}_0
c  in DIMACS:
 14459  14460  14461 -850 -14462 0
 14459  14460  14461 -850 -14463 0
 14459  14460  14461 -850  14464 0

c  1+1 --> 2
c    (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0 ∧  p_850) -> (-b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0)
c  in CNF:
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_2
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨  b^{25, 35}_1
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ -p_850 ∨ -b^{25, 35}_0
c  in DIMACS:
 14459  14460 -14461 -850 -14462 0
 14459  14460 -14461 -850  14463 0
 14459  14460 -14461 -850 -14464 0

c  2+1 --> break 
c    (-b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧  p_850) -> break
c  in CNF:
c     b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 14459 -14460  14461 -850 1162 0


c  2-1 --> 1
c    (-b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧ -p_850) -> (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0)
c  in CNF:
c     b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_2
c     b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_1
c     b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨  b^{25, 35}_0
c  in DIMACS:
 14459 -14460  14461  850 -14462 0
 14459 -14460  14461  850 -14463 0
 14459 -14460  14461  850  14464 0

c  1-1 --> 0
c    (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0 ∧ -p_850) -> (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧ -b^{25, 35}_0)
c  in CNF:
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_2
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_1
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_0
c  in DIMACS:
 14459  14460 -14461  850 -14462 0
 14459  14460 -14461  850 -14463 0
 14459  14460 -14461  850 -14464 0

c  0-1 --> -1
c    (-b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧ -p_850) -> ( b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0)
c  in CNF:
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨  b^{25, 35}_2
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_1
c     b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨  b^{25, 35}_0
c  in DIMACS:
 14459  14460  14461  850  14462 0
 14459  14460  14461  850 -14463 0
 14459  14460  14461  850  14464 0

c  -1-1 --> -2
c    ( b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧  b^{25, 34}_0 ∧ -p_850) -> ( b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0)
c  in CNF:
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨  b^{25, 35}_2
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨  b^{25, 35}_1
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨  p_850 ∨ -b^{25, 35}_0
c  in DIMACS:
-14459  14460 -14461  850  14462 0
-14459  14460 -14461  850  14463 0
-14459  14460 -14461  850 -14464 0

c  -2-1 --> break 
c    ( b^{25, 34}_2 ∧  b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨  b^{25, 34}_0 ∨  p_850 ∨ break
c  in DIMACS:
-14459 -14460  14461  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 34}_2 ∧ -b^{25, 34}_1 ∧ -b^{25, 34}_0 ∧ true) 
c  in CNF:
c    -b^{25, 34}_2 ∨  b^{25, 34}_1 ∨  b^{25, 34}_0 ∨ false 
c  in DIMACS:
-14459  14460  14461  0

c  3 does not represent an automaton state.
c    -(-b^{25, 34}_2 ∧  b^{25, 34}_1 ∧  b^{25, 34}_0 ∧ true) 
c  in CNF:
c     b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ false 
c  in DIMACS:
 14459 -14460 -14461  0
c  -3 does not represent an automaton state.
c    -( b^{25, 34}_2 ∧  b^{25, 34}_1 ∧  b^{25, 34}_0 ∧ true) 
c  in CNF:
c    -b^{25, 34}_2 ∨ -b^{25, 34}_1 ∨ -b^{25, 34}_0 ∨ false 
c  in DIMACS:
-14459 -14460 -14461  0

c i = 35
c  -2+1 --> -1
c    ( b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧  p_875) -> ( b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0)
c  in CNF:
c    -b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨  b^{25, 36}_2
c    -b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_1
c    -b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨  b^{25, 36}_0
c  in DIMACS:
-14462 -14463  14464 -875  14465 0
-14462 -14463  14464 -875 -14466 0
-14462 -14463  14464 -875  14467 0

c  -1+1 --> 0
c    ( b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0 ∧  p_875) -> (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧ -b^{25, 36}_0)
c  in CNF:
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_2
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_1
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_0
c  in DIMACS:
-14462  14463 -14464 -875 -14465 0
-14462  14463 -14464 -875 -14466 0
-14462  14463 -14464 -875 -14467 0

c  0+1 --> 1
c    (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧  p_875) -> (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0)
c  in CNF:
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_2
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_1
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨  b^{25, 36}_0
c  in DIMACS:
 14462  14463  14464 -875 -14465 0
 14462  14463  14464 -875 -14466 0
 14462  14463  14464 -875  14467 0

c  1+1 --> 2
c    (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0 ∧  p_875) -> (-b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0)
c  in CNF:
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_2
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨  b^{25, 36}_1
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ -p_875 ∨ -b^{25, 36}_0
c  in DIMACS:
 14462  14463 -14464 -875 -14465 0
 14462  14463 -14464 -875  14466 0
 14462  14463 -14464 -875 -14467 0

c  2+1 --> break 
c    (-b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧  p_875) -> break
c  in CNF:
c     b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 14462 -14463  14464 -875 1162 0


c  2-1 --> 1
c    (-b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧ -p_875) -> (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0)
c  in CNF:
c     b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_2
c     b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_1
c     b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨  b^{25, 36}_0
c  in DIMACS:
 14462 -14463  14464  875 -14465 0
 14462 -14463  14464  875 -14466 0
 14462 -14463  14464  875  14467 0

c  1-1 --> 0
c    (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0 ∧ -p_875) -> (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧ -b^{25, 36}_0)
c  in CNF:
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_2
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_1
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_0
c  in DIMACS:
 14462  14463 -14464  875 -14465 0
 14462  14463 -14464  875 -14466 0
 14462  14463 -14464  875 -14467 0

c  0-1 --> -1
c    (-b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧ -p_875) -> ( b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0)
c  in CNF:
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨  b^{25, 36}_2
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_1
c     b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨  b^{25, 36}_0
c  in DIMACS:
 14462  14463  14464  875  14465 0
 14462  14463  14464  875 -14466 0
 14462  14463  14464  875  14467 0

c  -1-1 --> -2
c    ( b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧  b^{25, 35}_0 ∧ -p_875) -> ( b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0)
c  in CNF:
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨  b^{25, 36}_2
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨  b^{25, 36}_1
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨  p_875 ∨ -b^{25, 36}_0
c  in DIMACS:
-14462  14463 -14464  875  14465 0
-14462  14463 -14464  875  14466 0
-14462  14463 -14464  875 -14467 0

c  -2-1 --> break 
c    ( b^{25, 35}_2 ∧  b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨  b^{25, 35}_0 ∨  p_875 ∨ break
c  in DIMACS:
-14462 -14463  14464  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 35}_2 ∧ -b^{25, 35}_1 ∧ -b^{25, 35}_0 ∧ true) 
c  in CNF:
c    -b^{25, 35}_2 ∨  b^{25, 35}_1 ∨  b^{25, 35}_0 ∨ false 
c  in DIMACS:
-14462  14463  14464  0

c  3 does not represent an automaton state.
c    -(-b^{25, 35}_2 ∧  b^{25, 35}_1 ∧  b^{25, 35}_0 ∧ true) 
c  in CNF:
c     b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ false 
c  in DIMACS:
 14462 -14463 -14464  0
c  -3 does not represent an automaton state.
c    -( b^{25, 35}_2 ∧  b^{25, 35}_1 ∧  b^{25, 35}_0 ∧ true) 
c  in CNF:
c    -b^{25, 35}_2 ∨ -b^{25, 35}_1 ∨ -b^{25, 35}_0 ∨ false 
c  in DIMACS:
-14462 -14463 -14464  0

c i = 36
c  -2+1 --> -1
c    ( b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧  p_900) -> ( b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0)
c  in CNF:
c    -b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨  b^{25, 37}_2
c    -b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_1
c    -b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨  b^{25, 37}_0
c  in DIMACS:
-14465 -14466  14467 -900  14468 0
-14465 -14466  14467 -900 -14469 0
-14465 -14466  14467 -900  14470 0

c  -1+1 --> 0
c    ( b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0 ∧  p_900) -> (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧ -b^{25, 37}_0)
c  in CNF:
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_2
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_1
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_0
c  in DIMACS:
-14465  14466 -14467 -900 -14468 0
-14465  14466 -14467 -900 -14469 0
-14465  14466 -14467 -900 -14470 0

c  0+1 --> 1
c    (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧  p_900) -> (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0)
c  in CNF:
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_2
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_1
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨  b^{25, 37}_0
c  in DIMACS:
 14465  14466  14467 -900 -14468 0
 14465  14466  14467 -900 -14469 0
 14465  14466  14467 -900  14470 0

c  1+1 --> 2
c    (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0 ∧  p_900) -> (-b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0)
c  in CNF:
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_2
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨  b^{25, 37}_1
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ -p_900 ∨ -b^{25, 37}_0
c  in DIMACS:
 14465  14466 -14467 -900 -14468 0
 14465  14466 -14467 -900  14469 0
 14465  14466 -14467 -900 -14470 0

c  2+1 --> break 
c    (-b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧  p_900) -> break
c  in CNF:
c     b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 14465 -14466  14467 -900 1162 0


c  2-1 --> 1
c    (-b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧ -p_900) -> (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0)
c  in CNF:
c     b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_2
c     b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_1
c     b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨  b^{25, 37}_0
c  in DIMACS:
 14465 -14466  14467  900 -14468 0
 14465 -14466  14467  900 -14469 0
 14465 -14466  14467  900  14470 0

c  1-1 --> 0
c    (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0 ∧ -p_900) -> (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧ -b^{25, 37}_0)
c  in CNF:
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_2
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_1
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_0
c  in DIMACS:
 14465  14466 -14467  900 -14468 0
 14465  14466 -14467  900 -14469 0
 14465  14466 -14467  900 -14470 0

c  0-1 --> -1
c    (-b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧ -p_900) -> ( b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0)
c  in CNF:
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨  b^{25, 37}_2
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_1
c     b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨  b^{25, 37}_0
c  in DIMACS:
 14465  14466  14467  900  14468 0
 14465  14466  14467  900 -14469 0
 14465  14466  14467  900  14470 0

c  -1-1 --> -2
c    ( b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧  b^{25, 36}_0 ∧ -p_900) -> ( b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0)
c  in CNF:
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨  b^{25, 37}_2
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨  b^{25, 37}_1
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨  p_900 ∨ -b^{25, 37}_0
c  in DIMACS:
-14465  14466 -14467  900  14468 0
-14465  14466 -14467  900  14469 0
-14465  14466 -14467  900 -14470 0

c  -2-1 --> break 
c    ( b^{25, 36}_2 ∧  b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨  b^{25, 36}_0 ∨  p_900 ∨ break
c  in DIMACS:
-14465 -14466  14467  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 36}_2 ∧ -b^{25, 36}_1 ∧ -b^{25, 36}_0 ∧ true) 
c  in CNF:
c    -b^{25, 36}_2 ∨  b^{25, 36}_1 ∨  b^{25, 36}_0 ∨ false 
c  in DIMACS:
-14465  14466  14467  0

c  3 does not represent an automaton state.
c    -(-b^{25, 36}_2 ∧  b^{25, 36}_1 ∧  b^{25, 36}_0 ∧ true) 
c  in CNF:
c     b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ false 
c  in DIMACS:
 14465 -14466 -14467  0
c  -3 does not represent an automaton state.
c    -( b^{25, 36}_2 ∧  b^{25, 36}_1 ∧  b^{25, 36}_0 ∧ true) 
c  in CNF:
c    -b^{25, 36}_2 ∨ -b^{25, 36}_1 ∨ -b^{25, 36}_0 ∨ false 
c  in DIMACS:
-14465 -14466 -14467  0

c i = 37
c  -2+1 --> -1
c    ( b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧  p_925) -> ( b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0)
c  in CNF:
c    -b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨  b^{25, 38}_2
c    -b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_1
c    -b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨  b^{25, 38}_0
c  in DIMACS:
-14468 -14469  14470 -925  14471 0
-14468 -14469  14470 -925 -14472 0
-14468 -14469  14470 -925  14473 0

c  -1+1 --> 0
c    ( b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0 ∧  p_925) -> (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧ -b^{25, 38}_0)
c  in CNF:
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_2
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_1
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_0
c  in DIMACS:
-14468  14469 -14470 -925 -14471 0
-14468  14469 -14470 -925 -14472 0
-14468  14469 -14470 -925 -14473 0

c  0+1 --> 1
c    (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧  p_925) -> (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0)
c  in CNF:
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_2
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_1
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨  b^{25, 38}_0
c  in DIMACS:
 14468  14469  14470 -925 -14471 0
 14468  14469  14470 -925 -14472 0
 14468  14469  14470 -925  14473 0

c  1+1 --> 2
c    (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0 ∧  p_925) -> (-b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0)
c  in CNF:
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_2
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨  b^{25, 38}_1
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ -p_925 ∨ -b^{25, 38}_0
c  in DIMACS:
 14468  14469 -14470 -925 -14471 0
 14468  14469 -14470 -925  14472 0
 14468  14469 -14470 -925 -14473 0

c  2+1 --> break 
c    (-b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧  p_925) -> break
c  in CNF:
c     b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ -p_925 ∨ break
c  in DIMACS:
 14468 -14469  14470 -925 1162 0


c  2-1 --> 1
c    (-b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧ -p_925) -> (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0)
c  in CNF:
c     b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_2
c     b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_1
c     b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨  b^{25, 38}_0
c  in DIMACS:
 14468 -14469  14470  925 -14471 0
 14468 -14469  14470  925 -14472 0
 14468 -14469  14470  925  14473 0

c  1-1 --> 0
c    (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0 ∧ -p_925) -> (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧ -b^{25, 38}_0)
c  in CNF:
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_2
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_1
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_0
c  in DIMACS:
 14468  14469 -14470  925 -14471 0
 14468  14469 -14470  925 -14472 0
 14468  14469 -14470  925 -14473 0

c  0-1 --> -1
c    (-b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧ -p_925) -> ( b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0)
c  in CNF:
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨  b^{25, 38}_2
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_1
c     b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨  b^{25, 38}_0
c  in DIMACS:
 14468  14469  14470  925  14471 0
 14468  14469  14470  925 -14472 0
 14468  14469  14470  925  14473 0

c  -1-1 --> -2
c    ( b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧  b^{25, 37}_0 ∧ -p_925) -> ( b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0)
c  in CNF:
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨  b^{25, 38}_2
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨  b^{25, 38}_1
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨  p_925 ∨ -b^{25, 38}_0
c  in DIMACS:
-14468  14469 -14470  925  14471 0
-14468  14469 -14470  925  14472 0
-14468  14469 -14470  925 -14473 0

c  -2-1 --> break 
c    ( b^{25, 37}_2 ∧  b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧ -p_925) -> break
c  in CNF:
c    -b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨  b^{25, 37}_0 ∨  p_925 ∨ break
c  in DIMACS:
-14468 -14469  14470  925 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 37}_2 ∧ -b^{25, 37}_1 ∧ -b^{25, 37}_0 ∧ true) 
c  in CNF:
c    -b^{25, 37}_2 ∨  b^{25, 37}_1 ∨  b^{25, 37}_0 ∨ false 
c  in DIMACS:
-14468  14469  14470  0

c  3 does not represent an automaton state.
c    -(-b^{25, 37}_2 ∧  b^{25, 37}_1 ∧  b^{25, 37}_0 ∧ true) 
c  in CNF:
c     b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ false 
c  in DIMACS:
 14468 -14469 -14470  0
c  -3 does not represent an automaton state.
c    -( b^{25, 37}_2 ∧  b^{25, 37}_1 ∧  b^{25, 37}_0 ∧ true) 
c  in CNF:
c    -b^{25, 37}_2 ∨ -b^{25, 37}_1 ∨ -b^{25, 37}_0 ∨ false 
c  in DIMACS:
-14468 -14469 -14470  0

c i = 38
c  -2+1 --> -1
c    ( b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧  p_950) -> ( b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0)
c  in CNF:
c    -b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨  b^{25, 39}_2
c    -b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_1
c    -b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨  b^{25, 39}_0
c  in DIMACS:
-14471 -14472  14473 -950  14474 0
-14471 -14472  14473 -950 -14475 0
-14471 -14472  14473 -950  14476 0

c  -1+1 --> 0
c    ( b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0 ∧  p_950) -> (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧ -b^{25, 39}_0)
c  in CNF:
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_2
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_1
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_0
c  in DIMACS:
-14471  14472 -14473 -950 -14474 0
-14471  14472 -14473 -950 -14475 0
-14471  14472 -14473 -950 -14476 0

c  0+1 --> 1
c    (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧  p_950) -> (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0)
c  in CNF:
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_2
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_1
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨  b^{25, 39}_0
c  in DIMACS:
 14471  14472  14473 -950 -14474 0
 14471  14472  14473 -950 -14475 0
 14471  14472  14473 -950  14476 0

c  1+1 --> 2
c    (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0 ∧  p_950) -> (-b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0)
c  in CNF:
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_2
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨  b^{25, 39}_1
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ -p_950 ∨ -b^{25, 39}_0
c  in DIMACS:
 14471  14472 -14473 -950 -14474 0
 14471  14472 -14473 -950  14475 0
 14471  14472 -14473 -950 -14476 0

c  2+1 --> break 
c    (-b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧  p_950) -> break
c  in CNF:
c     b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 14471 -14472  14473 -950 1162 0


c  2-1 --> 1
c    (-b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧ -p_950) -> (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0)
c  in CNF:
c     b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_2
c     b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_1
c     b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨  b^{25, 39}_0
c  in DIMACS:
 14471 -14472  14473  950 -14474 0
 14471 -14472  14473  950 -14475 0
 14471 -14472  14473  950  14476 0

c  1-1 --> 0
c    (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0 ∧ -p_950) -> (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧ -b^{25, 39}_0)
c  in CNF:
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_2
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_1
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_0
c  in DIMACS:
 14471  14472 -14473  950 -14474 0
 14471  14472 -14473  950 -14475 0
 14471  14472 -14473  950 -14476 0

c  0-1 --> -1
c    (-b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧ -p_950) -> ( b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0)
c  in CNF:
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨  b^{25, 39}_2
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_1
c     b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨  b^{25, 39}_0
c  in DIMACS:
 14471  14472  14473  950  14474 0
 14471  14472  14473  950 -14475 0
 14471  14472  14473  950  14476 0

c  -1-1 --> -2
c    ( b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧  b^{25, 38}_0 ∧ -p_950) -> ( b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0)
c  in CNF:
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨  b^{25, 39}_2
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨  b^{25, 39}_1
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨  p_950 ∨ -b^{25, 39}_0
c  in DIMACS:
-14471  14472 -14473  950  14474 0
-14471  14472 -14473  950  14475 0
-14471  14472 -14473  950 -14476 0

c  -2-1 --> break 
c    ( b^{25, 38}_2 ∧  b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨  b^{25, 38}_0 ∨  p_950 ∨ break
c  in DIMACS:
-14471 -14472  14473  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 38}_2 ∧ -b^{25, 38}_1 ∧ -b^{25, 38}_0 ∧ true) 
c  in CNF:
c    -b^{25, 38}_2 ∨  b^{25, 38}_1 ∨  b^{25, 38}_0 ∨ false 
c  in DIMACS:
-14471  14472  14473  0

c  3 does not represent an automaton state.
c    -(-b^{25, 38}_2 ∧  b^{25, 38}_1 ∧  b^{25, 38}_0 ∧ true) 
c  in CNF:
c     b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ false 
c  in DIMACS:
 14471 -14472 -14473  0
c  -3 does not represent an automaton state.
c    -( b^{25, 38}_2 ∧  b^{25, 38}_1 ∧  b^{25, 38}_0 ∧ true) 
c  in CNF:
c    -b^{25, 38}_2 ∨ -b^{25, 38}_1 ∨ -b^{25, 38}_0 ∨ false 
c  in DIMACS:
-14471 -14472 -14473  0

c i = 39
c  -2+1 --> -1
c    ( b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧  p_975) -> ( b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0)
c  in CNF:
c    -b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨  b^{25, 40}_2
c    -b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_1
c    -b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨  b^{25, 40}_0
c  in DIMACS:
-14474 -14475  14476 -975  14477 0
-14474 -14475  14476 -975 -14478 0
-14474 -14475  14476 -975  14479 0

c  -1+1 --> 0
c    ( b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0 ∧  p_975) -> (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧ -b^{25, 40}_0)
c  in CNF:
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_2
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_1
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_0
c  in DIMACS:
-14474  14475 -14476 -975 -14477 0
-14474  14475 -14476 -975 -14478 0
-14474  14475 -14476 -975 -14479 0

c  0+1 --> 1
c    (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧  p_975) -> (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0)
c  in CNF:
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_2
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_1
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨  b^{25, 40}_0
c  in DIMACS:
 14474  14475  14476 -975 -14477 0
 14474  14475  14476 -975 -14478 0
 14474  14475  14476 -975  14479 0

c  1+1 --> 2
c    (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0 ∧  p_975) -> (-b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0)
c  in CNF:
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_2
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨  b^{25, 40}_1
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ -p_975 ∨ -b^{25, 40}_0
c  in DIMACS:
 14474  14475 -14476 -975 -14477 0
 14474  14475 -14476 -975  14478 0
 14474  14475 -14476 -975 -14479 0

c  2+1 --> break 
c    (-b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧  p_975) -> break
c  in CNF:
c     b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 14474 -14475  14476 -975 1162 0


c  2-1 --> 1
c    (-b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧ -p_975) -> (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0)
c  in CNF:
c     b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_2
c     b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_1
c     b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨  b^{25, 40}_0
c  in DIMACS:
 14474 -14475  14476  975 -14477 0
 14474 -14475  14476  975 -14478 0
 14474 -14475  14476  975  14479 0

c  1-1 --> 0
c    (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0 ∧ -p_975) -> (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧ -b^{25, 40}_0)
c  in CNF:
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_2
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_1
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_0
c  in DIMACS:
 14474  14475 -14476  975 -14477 0
 14474  14475 -14476  975 -14478 0
 14474  14475 -14476  975 -14479 0

c  0-1 --> -1
c    (-b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧ -p_975) -> ( b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0)
c  in CNF:
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨  b^{25, 40}_2
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_1
c     b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨  b^{25, 40}_0
c  in DIMACS:
 14474  14475  14476  975  14477 0
 14474  14475  14476  975 -14478 0
 14474  14475  14476  975  14479 0

c  -1-1 --> -2
c    ( b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧  b^{25, 39}_0 ∧ -p_975) -> ( b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0)
c  in CNF:
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨  b^{25, 40}_2
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨  b^{25, 40}_1
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨  p_975 ∨ -b^{25, 40}_0
c  in DIMACS:
-14474  14475 -14476  975  14477 0
-14474  14475 -14476  975  14478 0
-14474  14475 -14476  975 -14479 0

c  -2-1 --> break 
c    ( b^{25, 39}_2 ∧  b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨  b^{25, 39}_0 ∨  p_975 ∨ break
c  in DIMACS:
-14474 -14475  14476  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 39}_2 ∧ -b^{25, 39}_1 ∧ -b^{25, 39}_0 ∧ true) 
c  in CNF:
c    -b^{25, 39}_2 ∨  b^{25, 39}_1 ∨  b^{25, 39}_0 ∨ false 
c  in DIMACS:
-14474  14475  14476  0

c  3 does not represent an automaton state.
c    -(-b^{25, 39}_2 ∧  b^{25, 39}_1 ∧  b^{25, 39}_0 ∧ true) 
c  in CNF:
c     b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ false 
c  in DIMACS:
 14474 -14475 -14476  0
c  -3 does not represent an automaton state.
c    -( b^{25, 39}_2 ∧  b^{25, 39}_1 ∧  b^{25, 39}_0 ∧ true) 
c  in CNF:
c    -b^{25, 39}_2 ∨ -b^{25, 39}_1 ∨ -b^{25, 39}_0 ∨ false 
c  in DIMACS:
-14474 -14475 -14476  0

c i = 40
c  -2+1 --> -1
c    ( b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧  p_1000) -> ( b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0)
c  in CNF:
c    -b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨  b^{25, 41}_2
c    -b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_1
c    -b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨  b^{25, 41}_0
c  in DIMACS:
-14477 -14478  14479 -1000  14480 0
-14477 -14478  14479 -1000 -14481 0
-14477 -14478  14479 -1000  14482 0

c  -1+1 --> 0
c    ( b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0 ∧  p_1000) -> (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧ -b^{25, 41}_0)
c  in CNF:
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_2
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_1
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_0
c  in DIMACS:
-14477  14478 -14479 -1000 -14480 0
-14477  14478 -14479 -1000 -14481 0
-14477  14478 -14479 -1000 -14482 0

c  0+1 --> 1
c    (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧  p_1000) -> (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0)
c  in CNF:
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_2
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_1
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨  b^{25, 41}_0
c  in DIMACS:
 14477  14478  14479 -1000 -14480 0
 14477  14478  14479 -1000 -14481 0
 14477  14478  14479 -1000  14482 0

c  1+1 --> 2
c    (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0 ∧  p_1000) -> (-b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0)
c  in CNF:
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_2
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨  b^{25, 41}_1
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ -p_1000 ∨ -b^{25, 41}_0
c  in DIMACS:
 14477  14478 -14479 -1000 -14480 0
 14477  14478 -14479 -1000  14481 0
 14477  14478 -14479 -1000 -14482 0

c  2+1 --> break 
c    (-b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 14477 -14478  14479 -1000 1162 0


c  2-1 --> 1
c    (-b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧ -p_1000) -> (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0)
c  in CNF:
c     b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_2
c     b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_1
c     b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨  b^{25, 41}_0
c  in DIMACS:
 14477 -14478  14479  1000 -14480 0
 14477 -14478  14479  1000 -14481 0
 14477 -14478  14479  1000  14482 0

c  1-1 --> 0
c    (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0 ∧ -p_1000) -> (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧ -b^{25, 41}_0)
c  in CNF:
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_2
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_1
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_0
c  in DIMACS:
 14477  14478 -14479  1000 -14480 0
 14477  14478 -14479  1000 -14481 0
 14477  14478 -14479  1000 -14482 0

c  0-1 --> -1
c    (-b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧ -p_1000) -> ( b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0)
c  in CNF:
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨  b^{25, 41}_2
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_1
c     b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨  b^{25, 41}_0
c  in DIMACS:
 14477  14478  14479  1000  14480 0
 14477  14478  14479  1000 -14481 0
 14477  14478  14479  1000  14482 0

c  -1-1 --> -2
c    ( b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧  b^{25, 40}_0 ∧ -p_1000) -> ( b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0)
c  in CNF:
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨  b^{25, 41}_2
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨  b^{25, 41}_1
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨  p_1000 ∨ -b^{25, 41}_0
c  in DIMACS:
-14477  14478 -14479  1000  14480 0
-14477  14478 -14479  1000  14481 0
-14477  14478 -14479  1000 -14482 0

c  -2-1 --> break 
c    ( b^{25, 40}_2 ∧  b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨  b^{25, 40}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-14477 -14478  14479  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 40}_2 ∧ -b^{25, 40}_1 ∧ -b^{25, 40}_0 ∧ true) 
c  in CNF:
c    -b^{25, 40}_2 ∨  b^{25, 40}_1 ∨  b^{25, 40}_0 ∨ false 
c  in DIMACS:
-14477  14478  14479  0

c  3 does not represent an automaton state.
c    -(-b^{25, 40}_2 ∧  b^{25, 40}_1 ∧  b^{25, 40}_0 ∧ true) 
c  in CNF:
c     b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ false 
c  in DIMACS:
 14477 -14478 -14479  0
c  -3 does not represent an automaton state.
c    -( b^{25, 40}_2 ∧  b^{25, 40}_1 ∧  b^{25, 40}_0 ∧ true) 
c  in CNF:
c    -b^{25, 40}_2 ∨ -b^{25, 40}_1 ∨ -b^{25, 40}_0 ∨ false 
c  in DIMACS:
-14477 -14478 -14479  0

c i = 41
c  -2+1 --> -1
c    ( b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧  p_1025) -> ( b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0)
c  in CNF:
c    -b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨  b^{25, 42}_2
c    -b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_1
c    -b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨  b^{25, 42}_0
c  in DIMACS:
-14480 -14481  14482 -1025  14483 0
-14480 -14481  14482 -1025 -14484 0
-14480 -14481  14482 -1025  14485 0

c  -1+1 --> 0
c    ( b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0 ∧  p_1025) -> (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧ -b^{25, 42}_0)
c  in CNF:
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_2
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_1
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_0
c  in DIMACS:
-14480  14481 -14482 -1025 -14483 0
-14480  14481 -14482 -1025 -14484 0
-14480  14481 -14482 -1025 -14485 0

c  0+1 --> 1
c    (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧  p_1025) -> (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0)
c  in CNF:
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_2
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_1
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨  b^{25, 42}_0
c  in DIMACS:
 14480  14481  14482 -1025 -14483 0
 14480  14481  14482 -1025 -14484 0
 14480  14481  14482 -1025  14485 0

c  1+1 --> 2
c    (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0 ∧  p_1025) -> (-b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0)
c  in CNF:
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_2
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨  b^{25, 42}_1
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ -p_1025 ∨ -b^{25, 42}_0
c  in DIMACS:
 14480  14481 -14482 -1025 -14483 0
 14480  14481 -14482 -1025  14484 0
 14480  14481 -14482 -1025 -14485 0

c  2+1 --> break 
c    (-b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧  p_1025) -> break
c  in CNF:
c     b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ -p_1025 ∨ break
c  in DIMACS:
 14480 -14481  14482 -1025 1162 0


c  2-1 --> 1
c    (-b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧ -p_1025) -> (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0)
c  in CNF:
c     b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_2
c     b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_1
c     b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨  b^{25, 42}_0
c  in DIMACS:
 14480 -14481  14482  1025 -14483 0
 14480 -14481  14482  1025 -14484 0
 14480 -14481  14482  1025  14485 0

c  1-1 --> 0
c    (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0 ∧ -p_1025) -> (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧ -b^{25, 42}_0)
c  in CNF:
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_2
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_1
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_0
c  in DIMACS:
 14480  14481 -14482  1025 -14483 0
 14480  14481 -14482  1025 -14484 0
 14480  14481 -14482  1025 -14485 0

c  0-1 --> -1
c    (-b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧ -p_1025) -> ( b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0)
c  in CNF:
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨  b^{25, 42}_2
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_1
c     b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨  b^{25, 42}_0
c  in DIMACS:
 14480  14481  14482  1025  14483 0
 14480  14481  14482  1025 -14484 0
 14480  14481  14482  1025  14485 0

c  -1-1 --> -2
c    ( b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧  b^{25, 41}_0 ∧ -p_1025) -> ( b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0)
c  in CNF:
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨  b^{25, 42}_2
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨  b^{25, 42}_1
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨  p_1025 ∨ -b^{25, 42}_0
c  in DIMACS:
-14480  14481 -14482  1025  14483 0
-14480  14481 -14482  1025  14484 0
-14480  14481 -14482  1025 -14485 0

c  -2-1 --> break 
c    ( b^{25, 41}_2 ∧  b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧ -p_1025) -> break
c  in CNF:
c    -b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨  b^{25, 41}_0 ∨  p_1025 ∨ break
c  in DIMACS:
-14480 -14481  14482  1025 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 41}_2 ∧ -b^{25, 41}_1 ∧ -b^{25, 41}_0 ∧ true) 
c  in CNF:
c    -b^{25, 41}_2 ∨  b^{25, 41}_1 ∨  b^{25, 41}_0 ∨ false 
c  in DIMACS:
-14480  14481  14482  0

c  3 does not represent an automaton state.
c    -(-b^{25, 41}_2 ∧  b^{25, 41}_1 ∧  b^{25, 41}_0 ∧ true) 
c  in CNF:
c     b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ false 
c  in DIMACS:
 14480 -14481 -14482  0
c  -3 does not represent an automaton state.
c    -( b^{25, 41}_2 ∧  b^{25, 41}_1 ∧  b^{25, 41}_0 ∧ true) 
c  in CNF:
c    -b^{25, 41}_2 ∨ -b^{25, 41}_1 ∨ -b^{25, 41}_0 ∨ false 
c  in DIMACS:
-14480 -14481 -14482  0

c i = 42
c  -2+1 --> -1
c    ( b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧  p_1050) -> ( b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0)
c  in CNF:
c    -b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨  b^{25, 43}_2
c    -b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_1
c    -b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨  b^{25, 43}_0
c  in DIMACS:
-14483 -14484  14485 -1050  14486 0
-14483 -14484  14485 -1050 -14487 0
-14483 -14484  14485 -1050  14488 0

c  -1+1 --> 0
c    ( b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0 ∧  p_1050) -> (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧ -b^{25, 43}_0)
c  in CNF:
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_2
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_1
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_0
c  in DIMACS:
-14483  14484 -14485 -1050 -14486 0
-14483  14484 -14485 -1050 -14487 0
-14483  14484 -14485 -1050 -14488 0

c  0+1 --> 1
c    (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧  p_1050) -> (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0)
c  in CNF:
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_2
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_1
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨  b^{25, 43}_0
c  in DIMACS:
 14483  14484  14485 -1050 -14486 0
 14483  14484  14485 -1050 -14487 0
 14483  14484  14485 -1050  14488 0

c  1+1 --> 2
c    (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0 ∧  p_1050) -> (-b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0)
c  in CNF:
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_2
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨  b^{25, 43}_1
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ -p_1050 ∨ -b^{25, 43}_0
c  in DIMACS:
 14483  14484 -14485 -1050 -14486 0
 14483  14484 -14485 -1050  14487 0
 14483  14484 -14485 -1050 -14488 0

c  2+1 --> break 
c    (-b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 14483 -14484  14485 -1050 1162 0


c  2-1 --> 1
c    (-b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧ -p_1050) -> (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0)
c  in CNF:
c     b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_2
c     b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_1
c     b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨  b^{25, 43}_0
c  in DIMACS:
 14483 -14484  14485  1050 -14486 0
 14483 -14484  14485  1050 -14487 0
 14483 -14484  14485  1050  14488 0

c  1-1 --> 0
c    (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0 ∧ -p_1050) -> (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧ -b^{25, 43}_0)
c  in CNF:
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_2
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_1
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_0
c  in DIMACS:
 14483  14484 -14485  1050 -14486 0
 14483  14484 -14485  1050 -14487 0
 14483  14484 -14485  1050 -14488 0

c  0-1 --> -1
c    (-b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧ -p_1050) -> ( b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0)
c  in CNF:
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨  b^{25, 43}_2
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_1
c     b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨  b^{25, 43}_0
c  in DIMACS:
 14483  14484  14485  1050  14486 0
 14483  14484  14485  1050 -14487 0
 14483  14484  14485  1050  14488 0

c  -1-1 --> -2
c    ( b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧  b^{25, 42}_0 ∧ -p_1050) -> ( b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0)
c  in CNF:
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨  b^{25, 43}_2
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨  b^{25, 43}_1
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨  p_1050 ∨ -b^{25, 43}_0
c  in DIMACS:
-14483  14484 -14485  1050  14486 0
-14483  14484 -14485  1050  14487 0
-14483  14484 -14485  1050 -14488 0

c  -2-1 --> break 
c    ( b^{25, 42}_2 ∧  b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨  b^{25, 42}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-14483 -14484  14485  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 42}_2 ∧ -b^{25, 42}_1 ∧ -b^{25, 42}_0 ∧ true) 
c  in CNF:
c    -b^{25, 42}_2 ∨  b^{25, 42}_1 ∨  b^{25, 42}_0 ∨ false 
c  in DIMACS:
-14483  14484  14485  0

c  3 does not represent an automaton state.
c    -(-b^{25, 42}_2 ∧  b^{25, 42}_1 ∧  b^{25, 42}_0 ∧ true) 
c  in CNF:
c     b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ false 
c  in DIMACS:
 14483 -14484 -14485  0
c  -3 does not represent an automaton state.
c    -( b^{25, 42}_2 ∧  b^{25, 42}_1 ∧  b^{25, 42}_0 ∧ true) 
c  in CNF:
c    -b^{25, 42}_2 ∨ -b^{25, 42}_1 ∨ -b^{25, 42}_0 ∨ false 
c  in DIMACS:
-14483 -14484 -14485  0

c i = 43
c  -2+1 --> -1
c    ( b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧  p_1075) -> ( b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0)
c  in CNF:
c    -b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨  b^{25, 44}_2
c    -b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_1
c    -b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨  b^{25, 44}_0
c  in DIMACS:
-14486 -14487  14488 -1075  14489 0
-14486 -14487  14488 -1075 -14490 0
-14486 -14487  14488 -1075  14491 0

c  -1+1 --> 0
c    ( b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0 ∧  p_1075) -> (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧ -b^{25, 44}_0)
c  in CNF:
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_2
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_1
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_0
c  in DIMACS:
-14486  14487 -14488 -1075 -14489 0
-14486  14487 -14488 -1075 -14490 0
-14486  14487 -14488 -1075 -14491 0

c  0+1 --> 1
c    (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧  p_1075) -> (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0)
c  in CNF:
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_2
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_1
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨  b^{25, 44}_0
c  in DIMACS:
 14486  14487  14488 -1075 -14489 0
 14486  14487  14488 -1075 -14490 0
 14486  14487  14488 -1075  14491 0

c  1+1 --> 2
c    (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0 ∧  p_1075) -> (-b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0)
c  in CNF:
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_2
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨  b^{25, 44}_1
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ -p_1075 ∨ -b^{25, 44}_0
c  in DIMACS:
 14486  14487 -14488 -1075 -14489 0
 14486  14487 -14488 -1075  14490 0
 14486  14487 -14488 -1075 -14491 0

c  2+1 --> break 
c    (-b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧  p_1075) -> break
c  in CNF:
c     b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ -p_1075 ∨ break
c  in DIMACS:
 14486 -14487  14488 -1075 1162 0


c  2-1 --> 1
c    (-b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧ -p_1075) -> (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0)
c  in CNF:
c     b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_2
c     b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_1
c     b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨  b^{25, 44}_0
c  in DIMACS:
 14486 -14487  14488  1075 -14489 0
 14486 -14487  14488  1075 -14490 0
 14486 -14487  14488  1075  14491 0

c  1-1 --> 0
c    (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0 ∧ -p_1075) -> (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧ -b^{25, 44}_0)
c  in CNF:
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_2
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_1
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_0
c  in DIMACS:
 14486  14487 -14488  1075 -14489 0
 14486  14487 -14488  1075 -14490 0
 14486  14487 -14488  1075 -14491 0

c  0-1 --> -1
c    (-b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧ -p_1075) -> ( b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0)
c  in CNF:
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨  b^{25, 44}_2
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_1
c     b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨  b^{25, 44}_0
c  in DIMACS:
 14486  14487  14488  1075  14489 0
 14486  14487  14488  1075 -14490 0
 14486  14487  14488  1075  14491 0

c  -1-1 --> -2
c    ( b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧  b^{25, 43}_0 ∧ -p_1075) -> ( b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0)
c  in CNF:
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨  b^{25, 44}_2
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨  b^{25, 44}_1
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨  p_1075 ∨ -b^{25, 44}_0
c  in DIMACS:
-14486  14487 -14488  1075  14489 0
-14486  14487 -14488  1075  14490 0
-14486  14487 -14488  1075 -14491 0

c  -2-1 --> break 
c    ( b^{25, 43}_2 ∧  b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧ -p_1075) -> break
c  in CNF:
c    -b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨  b^{25, 43}_0 ∨  p_1075 ∨ break
c  in DIMACS:
-14486 -14487  14488  1075 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 43}_2 ∧ -b^{25, 43}_1 ∧ -b^{25, 43}_0 ∧ true) 
c  in CNF:
c    -b^{25, 43}_2 ∨  b^{25, 43}_1 ∨  b^{25, 43}_0 ∨ false 
c  in DIMACS:
-14486  14487  14488  0

c  3 does not represent an automaton state.
c    -(-b^{25, 43}_2 ∧  b^{25, 43}_1 ∧  b^{25, 43}_0 ∧ true) 
c  in CNF:
c     b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ false 
c  in DIMACS:
 14486 -14487 -14488  0
c  -3 does not represent an automaton state.
c    -( b^{25, 43}_2 ∧  b^{25, 43}_1 ∧  b^{25, 43}_0 ∧ true) 
c  in CNF:
c    -b^{25, 43}_2 ∨ -b^{25, 43}_1 ∨ -b^{25, 43}_0 ∨ false 
c  in DIMACS:
-14486 -14487 -14488  0

c i = 44
c  -2+1 --> -1
c    ( b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧  p_1100) -> ( b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0)
c  in CNF:
c    -b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨  b^{25, 45}_2
c    -b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_1
c    -b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨  b^{25, 45}_0
c  in DIMACS:
-14489 -14490  14491 -1100  14492 0
-14489 -14490  14491 -1100 -14493 0
-14489 -14490  14491 -1100  14494 0

c  -1+1 --> 0
c    ( b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0 ∧  p_1100) -> (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧ -b^{25, 45}_0)
c  in CNF:
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_2
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_1
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_0
c  in DIMACS:
-14489  14490 -14491 -1100 -14492 0
-14489  14490 -14491 -1100 -14493 0
-14489  14490 -14491 -1100 -14494 0

c  0+1 --> 1
c    (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧  p_1100) -> (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0)
c  in CNF:
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_2
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_1
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨  b^{25, 45}_0
c  in DIMACS:
 14489  14490  14491 -1100 -14492 0
 14489  14490  14491 -1100 -14493 0
 14489  14490  14491 -1100  14494 0

c  1+1 --> 2
c    (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0 ∧  p_1100) -> (-b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0)
c  in CNF:
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_2
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨  b^{25, 45}_1
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ -p_1100 ∨ -b^{25, 45}_0
c  in DIMACS:
 14489  14490 -14491 -1100 -14492 0
 14489  14490 -14491 -1100  14493 0
 14489  14490 -14491 -1100 -14494 0

c  2+1 --> break 
c    (-b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 14489 -14490  14491 -1100 1162 0


c  2-1 --> 1
c    (-b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧ -p_1100) -> (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0)
c  in CNF:
c     b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_2
c     b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_1
c     b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨  b^{25, 45}_0
c  in DIMACS:
 14489 -14490  14491  1100 -14492 0
 14489 -14490  14491  1100 -14493 0
 14489 -14490  14491  1100  14494 0

c  1-1 --> 0
c    (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0 ∧ -p_1100) -> (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧ -b^{25, 45}_0)
c  in CNF:
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_2
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_1
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_0
c  in DIMACS:
 14489  14490 -14491  1100 -14492 0
 14489  14490 -14491  1100 -14493 0
 14489  14490 -14491  1100 -14494 0

c  0-1 --> -1
c    (-b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧ -p_1100) -> ( b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0)
c  in CNF:
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨  b^{25, 45}_2
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_1
c     b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨  b^{25, 45}_0
c  in DIMACS:
 14489  14490  14491  1100  14492 0
 14489  14490  14491  1100 -14493 0
 14489  14490  14491  1100  14494 0

c  -1-1 --> -2
c    ( b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧  b^{25, 44}_0 ∧ -p_1100) -> ( b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0)
c  in CNF:
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨  b^{25, 45}_2
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨  b^{25, 45}_1
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨  p_1100 ∨ -b^{25, 45}_0
c  in DIMACS:
-14489  14490 -14491  1100  14492 0
-14489  14490 -14491  1100  14493 0
-14489  14490 -14491  1100 -14494 0

c  -2-1 --> break 
c    ( b^{25, 44}_2 ∧  b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨  b^{25, 44}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-14489 -14490  14491  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 44}_2 ∧ -b^{25, 44}_1 ∧ -b^{25, 44}_0 ∧ true) 
c  in CNF:
c    -b^{25, 44}_2 ∨  b^{25, 44}_1 ∨  b^{25, 44}_0 ∨ false 
c  in DIMACS:
-14489  14490  14491  0

c  3 does not represent an automaton state.
c    -(-b^{25, 44}_2 ∧  b^{25, 44}_1 ∧  b^{25, 44}_0 ∧ true) 
c  in CNF:
c     b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ false 
c  in DIMACS:
 14489 -14490 -14491  0
c  -3 does not represent an automaton state.
c    -( b^{25, 44}_2 ∧  b^{25, 44}_1 ∧  b^{25, 44}_0 ∧ true) 
c  in CNF:
c    -b^{25, 44}_2 ∨ -b^{25, 44}_1 ∨ -b^{25, 44}_0 ∨ false 
c  in DIMACS:
-14489 -14490 -14491  0

c i = 45
c  -2+1 --> -1
c    ( b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧  p_1125) -> ( b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0)
c  in CNF:
c    -b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨  b^{25, 46}_2
c    -b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_1
c    -b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨  b^{25, 46}_0
c  in DIMACS:
-14492 -14493  14494 -1125  14495 0
-14492 -14493  14494 -1125 -14496 0
-14492 -14493  14494 -1125  14497 0

c  -1+1 --> 0
c    ( b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0 ∧  p_1125) -> (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧ -b^{25, 46}_0)
c  in CNF:
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_2
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_1
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_0
c  in DIMACS:
-14492  14493 -14494 -1125 -14495 0
-14492  14493 -14494 -1125 -14496 0
-14492  14493 -14494 -1125 -14497 0

c  0+1 --> 1
c    (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧  p_1125) -> (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0)
c  in CNF:
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_2
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_1
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨  b^{25, 46}_0
c  in DIMACS:
 14492  14493  14494 -1125 -14495 0
 14492  14493  14494 -1125 -14496 0
 14492  14493  14494 -1125  14497 0

c  1+1 --> 2
c    (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0 ∧  p_1125) -> (-b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0)
c  in CNF:
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_2
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨  b^{25, 46}_1
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ -p_1125 ∨ -b^{25, 46}_0
c  in DIMACS:
 14492  14493 -14494 -1125 -14495 0
 14492  14493 -14494 -1125  14496 0
 14492  14493 -14494 -1125 -14497 0

c  2+1 --> break 
c    (-b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 14492 -14493  14494 -1125 1162 0


c  2-1 --> 1
c    (-b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧ -p_1125) -> (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0)
c  in CNF:
c     b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_2
c     b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_1
c     b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨  b^{25, 46}_0
c  in DIMACS:
 14492 -14493  14494  1125 -14495 0
 14492 -14493  14494  1125 -14496 0
 14492 -14493  14494  1125  14497 0

c  1-1 --> 0
c    (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0 ∧ -p_1125) -> (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧ -b^{25, 46}_0)
c  in CNF:
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_2
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_1
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_0
c  in DIMACS:
 14492  14493 -14494  1125 -14495 0
 14492  14493 -14494  1125 -14496 0
 14492  14493 -14494  1125 -14497 0

c  0-1 --> -1
c    (-b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧ -p_1125) -> ( b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0)
c  in CNF:
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨  b^{25, 46}_2
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_1
c     b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨  b^{25, 46}_0
c  in DIMACS:
 14492  14493  14494  1125  14495 0
 14492  14493  14494  1125 -14496 0
 14492  14493  14494  1125  14497 0

c  -1-1 --> -2
c    ( b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧  b^{25, 45}_0 ∧ -p_1125) -> ( b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0)
c  in CNF:
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨  b^{25, 46}_2
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨  b^{25, 46}_1
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨  p_1125 ∨ -b^{25, 46}_0
c  in DIMACS:
-14492  14493 -14494  1125  14495 0
-14492  14493 -14494  1125  14496 0
-14492  14493 -14494  1125 -14497 0

c  -2-1 --> break 
c    ( b^{25, 45}_2 ∧  b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨  b^{25, 45}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-14492 -14493  14494  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 45}_2 ∧ -b^{25, 45}_1 ∧ -b^{25, 45}_0 ∧ true) 
c  in CNF:
c    -b^{25, 45}_2 ∨  b^{25, 45}_1 ∨  b^{25, 45}_0 ∨ false 
c  in DIMACS:
-14492  14493  14494  0

c  3 does not represent an automaton state.
c    -(-b^{25, 45}_2 ∧  b^{25, 45}_1 ∧  b^{25, 45}_0 ∧ true) 
c  in CNF:
c     b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ false 
c  in DIMACS:
 14492 -14493 -14494  0
c  -3 does not represent an automaton state.
c    -( b^{25, 45}_2 ∧  b^{25, 45}_1 ∧  b^{25, 45}_0 ∧ true) 
c  in CNF:
c    -b^{25, 45}_2 ∨ -b^{25, 45}_1 ∨ -b^{25, 45}_0 ∨ false 
c  in DIMACS:
-14492 -14493 -14494  0

c i = 46
c  -2+1 --> -1
c    ( b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧  p_1150) -> ( b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧  b^{25, 47}_0)
c  in CNF:
c    -b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨  b^{25, 47}_2
c    -b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_1
c    -b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨  b^{25, 47}_0
c  in DIMACS:
-14495 -14496  14497 -1150  14498 0
-14495 -14496  14497 -1150 -14499 0
-14495 -14496  14497 -1150  14500 0

c  -1+1 --> 0
c    ( b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0 ∧  p_1150) -> (-b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧ -b^{25, 47}_0)
c  in CNF:
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_2
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_1
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_0
c  in DIMACS:
-14495  14496 -14497 -1150 -14498 0
-14495  14496 -14497 -1150 -14499 0
-14495  14496 -14497 -1150 -14500 0

c  0+1 --> 1
c    (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧  p_1150) -> (-b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧  b^{25, 47}_0)
c  in CNF:
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_2
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_1
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨  b^{25, 47}_0
c  in DIMACS:
 14495  14496  14497 -1150 -14498 0
 14495  14496  14497 -1150 -14499 0
 14495  14496  14497 -1150  14500 0

c  1+1 --> 2
c    (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0 ∧  p_1150) -> (-b^{25, 47}_2 ∧  b^{25, 47}_1 ∧ -b^{25, 47}_0)
c  in CNF:
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_2
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨  b^{25, 47}_1
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ -p_1150 ∨ -b^{25, 47}_0
c  in DIMACS:
 14495  14496 -14497 -1150 -14498 0
 14495  14496 -14497 -1150  14499 0
 14495  14496 -14497 -1150 -14500 0

c  2+1 --> break 
c    (-b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 14495 -14496  14497 -1150 1162 0


c  2-1 --> 1
c    (-b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧ -p_1150) -> (-b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧  b^{25, 47}_0)
c  in CNF:
c     b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_2
c     b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_1
c     b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨  b^{25, 47}_0
c  in DIMACS:
 14495 -14496  14497  1150 -14498 0
 14495 -14496  14497  1150 -14499 0
 14495 -14496  14497  1150  14500 0

c  1-1 --> 0
c    (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0 ∧ -p_1150) -> (-b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧ -b^{25, 47}_0)
c  in CNF:
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_2
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_1
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_0
c  in DIMACS:
 14495  14496 -14497  1150 -14498 0
 14495  14496 -14497  1150 -14499 0
 14495  14496 -14497  1150 -14500 0

c  0-1 --> -1
c    (-b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧ -p_1150) -> ( b^{25, 47}_2 ∧ -b^{25, 47}_1 ∧  b^{25, 47}_0)
c  in CNF:
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨  b^{25, 47}_2
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_1
c     b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨  b^{25, 47}_0
c  in DIMACS:
 14495  14496  14497  1150  14498 0
 14495  14496  14497  1150 -14499 0
 14495  14496  14497  1150  14500 0

c  -1-1 --> -2
c    ( b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧  b^{25, 46}_0 ∧ -p_1150) -> ( b^{25, 47}_2 ∧  b^{25, 47}_1 ∧ -b^{25, 47}_0)
c  in CNF:
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨  b^{25, 47}_2
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨  b^{25, 47}_1
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨  p_1150 ∨ -b^{25, 47}_0
c  in DIMACS:
-14495  14496 -14497  1150  14498 0
-14495  14496 -14497  1150  14499 0
-14495  14496 -14497  1150 -14500 0

c  -2-1 --> break 
c    ( b^{25, 46}_2 ∧  b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨  b^{25, 46}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-14495 -14496  14497  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{25, 46}_2 ∧ -b^{25, 46}_1 ∧ -b^{25, 46}_0 ∧ true) 
c  in CNF:
c    -b^{25, 46}_2 ∨  b^{25, 46}_1 ∨  b^{25, 46}_0 ∨ false 
c  in DIMACS:
-14495  14496  14497  0

c  3 does not represent an automaton state.
c    -(-b^{25, 46}_2 ∧  b^{25, 46}_1 ∧  b^{25, 46}_0 ∧ true) 
c  in CNF:
c     b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ false 
c  in DIMACS:
 14495 -14496 -14497  0
c  -3 does not represent an automaton state.
c    -( b^{25, 46}_2 ∧  b^{25, 46}_1 ∧  b^{25, 46}_0 ∧ true) 
c  in CNF:
c    -b^{25, 46}_2 ∨ -b^{25, 46}_1 ∨ -b^{25, 46}_0 ∨ false 
c  in DIMACS:
-14495 -14496 -14497  0

c INIT for k = 26
c    -b^{26, 1}_2
c    -b^{26, 1}_1
c    -b^{26, 1}_0
c  in DIMACS:
-14501 0
-14502 0
-14503 0

c Transitions for k = 26
c i = 1
c  -2+1 --> -1
c    ( b^{26, 1}_2 ∧  b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧  p_26) -> ( b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0)
c  in CNF:
c    -b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨  b^{26, 2}_2
c    -b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_1
c    -b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨  b^{26, 2}_0
c  in DIMACS:
-14501 -14502  14503 -26  14504 0
-14501 -14502  14503 -26 -14505 0
-14501 -14502  14503 -26  14506 0

c  -1+1 --> 0
c    ( b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧  b^{26, 1}_0 ∧  p_26) -> (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧ -b^{26, 2}_0)
c  in CNF:
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_2
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_1
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_0
c  in DIMACS:
-14501  14502 -14503 -26 -14504 0
-14501  14502 -14503 -26 -14505 0
-14501  14502 -14503 -26 -14506 0

c  0+1 --> 1
c    (-b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧  p_26) -> (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0)
c  in CNF:
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_2
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_1
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨  b^{26, 2}_0
c  in DIMACS:
 14501  14502  14503 -26 -14504 0
 14501  14502  14503 -26 -14505 0
 14501  14502  14503 -26  14506 0

c  1+1 --> 2
c    (-b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧  b^{26, 1}_0 ∧  p_26) -> (-b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0)
c  in CNF:
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_2
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨  b^{26, 2}_1
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ -p_26 ∨ -b^{26, 2}_0
c  in DIMACS:
 14501  14502 -14503 -26 -14504 0
 14501  14502 -14503 -26  14505 0
 14501  14502 -14503 -26 -14506 0

c  2+1 --> break 
c    (-b^{26, 1}_2 ∧  b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧  p_26) -> break
c  in CNF:
c     b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ -p_26 ∨ break
c  in DIMACS:
 14501 -14502  14503 -26 1162 0


c  2-1 --> 1
c    (-b^{26, 1}_2 ∧  b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧ -p_26) -> (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0)
c  in CNF:
c     b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_2
c     b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_1
c     b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨  b^{26, 2}_0
c  in DIMACS:
 14501 -14502  14503  26 -14504 0
 14501 -14502  14503  26 -14505 0
 14501 -14502  14503  26  14506 0

c  1-1 --> 0
c    (-b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧  b^{26, 1}_0 ∧ -p_26) -> (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧ -b^{26, 2}_0)
c  in CNF:
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_2
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_1
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_0
c  in DIMACS:
 14501  14502 -14503  26 -14504 0
 14501  14502 -14503  26 -14505 0
 14501  14502 -14503  26 -14506 0

c  0-1 --> -1
c    (-b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧ -p_26) -> ( b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0)
c  in CNF:
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨  b^{26, 2}_2
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_1
c     b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨  b^{26, 2}_0
c  in DIMACS:
 14501  14502  14503  26  14504 0
 14501  14502  14503  26 -14505 0
 14501  14502  14503  26  14506 0

c  -1-1 --> -2
c    ( b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧  b^{26, 1}_0 ∧ -p_26) -> ( b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0)
c  in CNF:
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨  b^{26, 2}_2
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨  b^{26, 2}_1
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨  p_26 ∨ -b^{26, 2}_0
c  in DIMACS:
-14501  14502 -14503  26  14504 0
-14501  14502 -14503  26  14505 0
-14501  14502 -14503  26 -14506 0

c  -2-1 --> break 
c    ( b^{26, 1}_2 ∧  b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧ -p_26) -> break
c  in CNF:
c    -b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨  b^{26, 1}_0 ∨  p_26 ∨ break
c  in DIMACS:
-14501 -14502  14503  26 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 1}_2 ∧ -b^{26, 1}_1 ∧ -b^{26, 1}_0 ∧ true) 
c  in CNF:
c    -b^{26, 1}_2 ∨  b^{26, 1}_1 ∨  b^{26, 1}_0 ∨ false 
c  in DIMACS:
-14501  14502  14503  0

c  3 does not represent an automaton state.
c    -(-b^{26, 1}_2 ∧  b^{26, 1}_1 ∧  b^{26, 1}_0 ∧ true) 
c  in CNF:
c     b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ false 
c  in DIMACS:
 14501 -14502 -14503  0
c  -3 does not represent an automaton state.
c    -( b^{26, 1}_2 ∧  b^{26, 1}_1 ∧  b^{26, 1}_0 ∧ true) 
c  in CNF:
c    -b^{26, 1}_2 ∨ -b^{26, 1}_1 ∨ -b^{26, 1}_0 ∨ false 
c  in DIMACS:
-14501 -14502 -14503  0

c i = 2
c  -2+1 --> -1
c    ( b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧  p_52) -> ( b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0)
c  in CNF:
c    -b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨  b^{26, 3}_2
c    -b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_1
c    -b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨  b^{26, 3}_0
c  in DIMACS:
-14504 -14505  14506 -52  14507 0
-14504 -14505  14506 -52 -14508 0
-14504 -14505  14506 -52  14509 0

c  -1+1 --> 0
c    ( b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0 ∧  p_52) -> (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧ -b^{26, 3}_0)
c  in CNF:
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_2
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_1
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_0
c  in DIMACS:
-14504  14505 -14506 -52 -14507 0
-14504  14505 -14506 -52 -14508 0
-14504  14505 -14506 -52 -14509 0

c  0+1 --> 1
c    (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧  p_52) -> (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0)
c  in CNF:
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_2
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_1
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨  b^{26, 3}_0
c  in DIMACS:
 14504  14505  14506 -52 -14507 0
 14504  14505  14506 -52 -14508 0
 14504  14505  14506 -52  14509 0

c  1+1 --> 2
c    (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0 ∧  p_52) -> (-b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0)
c  in CNF:
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_2
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨  b^{26, 3}_1
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ -p_52 ∨ -b^{26, 3}_0
c  in DIMACS:
 14504  14505 -14506 -52 -14507 0
 14504  14505 -14506 -52  14508 0
 14504  14505 -14506 -52 -14509 0

c  2+1 --> break 
c    (-b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧  p_52) -> break
c  in CNF:
c     b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 14504 -14505  14506 -52 1162 0


c  2-1 --> 1
c    (-b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧ -p_52) -> (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0)
c  in CNF:
c     b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_2
c     b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_1
c     b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨  b^{26, 3}_0
c  in DIMACS:
 14504 -14505  14506  52 -14507 0
 14504 -14505  14506  52 -14508 0
 14504 -14505  14506  52  14509 0

c  1-1 --> 0
c    (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0 ∧ -p_52) -> (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧ -b^{26, 3}_0)
c  in CNF:
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_2
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_1
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_0
c  in DIMACS:
 14504  14505 -14506  52 -14507 0
 14504  14505 -14506  52 -14508 0
 14504  14505 -14506  52 -14509 0

c  0-1 --> -1
c    (-b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧ -p_52) -> ( b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0)
c  in CNF:
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨  b^{26, 3}_2
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_1
c     b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨  b^{26, 3}_0
c  in DIMACS:
 14504  14505  14506  52  14507 0
 14504  14505  14506  52 -14508 0
 14504  14505  14506  52  14509 0

c  -1-1 --> -2
c    ( b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧  b^{26, 2}_0 ∧ -p_52) -> ( b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0)
c  in CNF:
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨  b^{26, 3}_2
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨  b^{26, 3}_1
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨  p_52 ∨ -b^{26, 3}_0
c  in DIMACS:
-14504  14505 -14506  52  14507 0
-14504  14505 -14506  52  14508 0
-14504  14505 -14506  52 -14509 0

c  -2-1 --> break 
c    ( b^{26, 2}_2 ∧  b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨  b^{26, 2}_0 ∨  p_52 ∨ break
c  in DIMACS:
-14504 -14505  14506  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 2}_2 ∧ -b^{26, 2}_1 ∧ -b^{26, 2}_0 ∧ true) 
c  in CNF:
c    -b^{26, 2}_2 ∨  b^{26, 2}_1 ∨  b^{26, 2}_0 ∨ false 
c  in DIMACS:
-14504  14505  14506  0

c  3 does not represent an automaton state.
c    -(-b^{26, 2}_2 ∧  b^{26, 2}_1 ∧  b^{26, 2}_0 ∧ true) 
c  in CNF:
c     b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ false 
c  in DIMACS:
 14504 -14505 -14506  0
c  -3 does not represent an automaton state.
c    -( b^{26, 2}_2 ∧  b^{26, 2}_1 ∧  b^{26, 2}_0 ∧ true) 
c  in CNF:
c    -b^{26, 2}_2 ∨ -b^{26, 2}_1 ∨ -b^{26, 2}_0 ∨ false 
c  in DIMACS:
-14504 -14505 -14506  0

c i = 3
c  -2+1 --> -1
c    ( b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧  p_78) -> ( b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0)
c  in CNF:
c    -b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨  b^{26, 4}_2
c    -b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_1
c    -b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨  b^{26, 4}_0
c  in DIMACS:
-14507 -14508  14509 -78  14510 0
-14507 -14508  14509 -78 -14511 0
-14507 -14508  14509 -78  14512 0

c  -1+1 --> 0
c    ( b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0 ∧  p_78) -> (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧ -b^{26, 4}_0)
c  in CNF:
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_2
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_1
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_0
c  in DIMACS:
-14507  14508 -14509 -78 -14510 0
-14507  14508 -14509 -78 -14511 0
-14507  14508 -14509 -78 -14512 0

c  0+1 --> 1
c    (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧  p_78) -> (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0)
c  in CNF:
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_2
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_1
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨  b^{26, 4}_0
c  in DIMACS:
 14507  14508  14509 -78 -14510 0
 14507  14508  14509 -78 -14511 0
 14507  14508  14509 -78  14512 0

c  1+1 --> 2
c    (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0 ∧  p_78) -> (-b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0)
c  in CNF:
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_2
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨  b^{26, 4}_1
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ -p_78 ∨ -b^{26, 4}_0
c  in DIMACS:
 14507  14508 -14509 -78 -14510 0
 14507  14508 -14509 -78  14511 0
 14507  14508 -14509 -78 -14512 0

c  2+1 --> break 
c    (-b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧  p_78) -> break
c  in CNF:
c     b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 14507 -14508  14509 -78 1162 0


c  2-1 --> 1
c    (-b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧ -p_78) -> (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0)
c  in CNF:
c     b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_2
c     b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_1
c     b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨  b^{26, 4}_0
c  in DIMACS:
 14507 -14508  14509  78 -14510 0
 14507 -14508  14509  78 -14511 0
 14507 -14508  14509  78  14512 0

c  1-1 --> 0
c    (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0 ∧ -p_78) -> (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧ -b^{26, 4}_0)
c  in CNF:
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_2
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_1
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_0
c  in DIMACS:
 14507  14508 -14509  78 -14510 0
 14507  14508 -14509  78 -14511 0
 14507  14508 -14509  78 -14512 0

c  0-1 --> -1
c    (-b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧ -p_78) -> ( b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0)
c  in CNF:
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨  b^{26, 4}_2
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_1
c     b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨  b^{26, 4}_0
c  in DIMACS:
 14507  14508  14509  78  14510 0
 14507  14508  14509  78 -14511 0
 14507  14508  14509  78  14512 0

c  -1-1 --> -2
c    ( b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧  b^{26, 3}_0 ∧ -p_78) -> ( b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0)
c  in CNF:
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨  b^{26, 4}_2
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨  b^{26, 4}_1
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨  p_78 ∨ -b^{26, 4}_0
c  in DIMACS:
-14507  14508 -14509  78  14510 0
-14507  14508 -14509  78  14511 0
-14507  14508 -14509  78 -14512 0

c  -2-1 --> break 
c    ( b^{26, 3}_2 ∧  b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨  b^{26, 3}_0 ∨  p_78 ∨ break
c  in DIMACS:
-14507 -14508  14509  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 3}_2 ∧ -b^{26, 3}_1 ∧ -b^{26, 3}_0 ∧ true) 
c  in CNF:
c    -b^{26, 3}_2 ∨  b^{26, 3}_1 ∨  b^{26, 3}_0 ∨ false 
c  in DIMACS:
-14507  14508  14509  0

c  3 does not represent an automaton state.
c    -(-b^{26, 3}_2 ∧  b^{26, 3}_1 ∧  b^{26, 3}_0 ∧ true) 
c  in CNF:
c     b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ false 
c  in DIMACS:
 14507 -14508 -14509  0
c  -3 does not represent an automaton state.
c    -( b^{26, 3}_2 ∧  b^{26, 3}_1 ∧  b^{26, 3}_0 ∧ true) 
c  in CNF:
c    -b^{26, 3}_2 ∨ -b^{26, 3}_1 ∨ -b^{26, 3}_0 ∨ false 
c  in DIMACS:
-14507 -14508 -14509  0

c i = 4
c  -2+1 --> -1
c    ( b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧  p_104) -> ( b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0)
c  in CNF:
c    -b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨  b^{26, 5}_2
c    -b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_1
c    -b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨  b^{26, 5}_0
c  in DIMACS:
-14510 -14511  14512 -104  14513 0
-14510 -14511  14512 -104 -14514 0
-14510 -14511  14512 -104  14515 0

c  -1+1 --> 0
c    ( b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0 ∧  p_104) -> (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧ -b^{26, 5}_0)
c  in CNF:
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_2
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_1
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_0
c  in DIMACS:
-14510  14511 -14512 -104 -14513 0
-14510  14511 -14512 -104 -14514 0
-14510  14511 -14512 -104 -14515 0

c  0+1 --> 1
c    (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧  p_104) -> (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0)
c  in CNF:
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_2
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_1
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨  b^{26, 5}_0
c  in DIMACS:
 14510  14511  14512 -104 -14513 0
 14510  14511  14512 -104 -14514 0
 14510  14511  14512 -104  14515 0

c  1+1 --> 2
c    (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0 ∧  p_104) -> (-b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0)
c  in CNF:
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_2
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨  b^{26, 5}_1
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ -p_104 ∨ -b^{26, 5}_0
c  in DIMACS:
 14510  14511 -14512 -104 -14513 0
 14510  14511 -14512 -104  14514 0
 14510  14511 -14512 -104 -14515 0

c  2+1 --> break 
c    (-b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧  p_104) -> break
c  in CNF:
c     b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 14510 -14511  14512 -104 1162 0


c  2-1 --> 1
c    (-b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧ -p_104) -> (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0)
c  in CNF:
c     b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_2
c     b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_1
c     b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨  b^{26, 5}_0
c  in DIMACS:
 14510 -14511  14512  104 -14513 0
 14510 -14511  14512  104 -14514 0
 14510 -14511  14512  104  14515 0

c  1-1 --> 0
c    (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0 ∧ -p_104) -> (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧ -b^{26, 5}_0)
c  in CNF:
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_2
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_1
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_0
c  in DIMACS:
 14510  14511 -14512  104 -14513 0
 14510  14511 -14512  104 -14514 0
 14510  14511 -14512  104 -14515 0

c  0-1 --> -1
c    (-b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧ -p_104) -> ( b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0)
c  in CNF:
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨  b^{26, 5}_2
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_1
c     b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨  b^{26, 5}_0
c  in DIMACS:
 14510  14511  14512  104  14513 0
 14510  14511  14512  104 -14514 0
 14510  14511  14512  104  14515 0

c  -1-1 --> -2
c    ( b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧  b^{26, 4}_0 ∧ -p_104) -> ( b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0)
c  in CNF:
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨  b^{26, 5}_2
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨  b^{26, 5}_1
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨  p_104 ∨ -b^{26, 5}_0
c  in DIMACS:
-14510  14511 -14512  104  14513 0
-14510  14511 -14512  104  14514 0
-14510  14511 -14512  104 -14515 0

c  -2-1 --> break 
c    ( b^{26, 4}_2 ∧  b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨  b^{26, 4}_0 ∨  p_104 ∨ break
c  in DIMACS:
-14510 -14511  14512  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 4}_2 ∧ -b^{26, 4}_1 ∧ -b^{26, 4}_0 ∧ true) 
c  in CNF:
c    -b^{26, 4}_2 ∨  b^{26, 4}_1 ∨  b^{26, 4}_0 ∨ false 
c  in DIMACS:
-14510  14511  14512  0

c  3 does not represent an automaton state.
c    -(-b^{26, 4}_2 ∧  b^{26, 4}_1 ∧  b^{26, 4}_0 ∧ true) 
c  in CNF:
c     b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ false 
c  in DIMACS:
 14510 -14511 -14512  0
c  -3 does not represent an automaton state.
c    -( b^{26, 4}_2 ∧  b^{26, 4}_1 ∧  b^{26, 4}_0 ∧ true) 
c  in CNF:
c    -b^{26, 4}_2 ∨ -b^{26, 4}_1 ∨ -b^{26, 4}_0 ∨ false 
c  in DIMACS:
-14510 -14511 -14512  0

c i = 5
c  -2+1 --> -1
c    ( b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧  p_130) -> ( b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0)
c  in CNF:
c    -b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨  b^{26, 6}_2
c    -b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_1
c    -b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨  b^{26, 6}_0
c  in DIMACS:
-14513 -14514  14515 -130  14516 0
-14513 -14514  14515 -130 -14517 0
-14513 -14514  14515 -130  14518 0

c  -1+1 --> 0
c    ( b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0 ∧  p_130) -> (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧ -b^{26, 6}_0)
c  in CNF:
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_2
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_1
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_0
c  in DIMACS:
-14513  14514 -14515 -130 -14516 0
-14513  14514 -14515 -130 -14517 0
-14513  14514 -14515 -130 -14518 0

c  0+1 --> 1
c    (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧  p_130) -> (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0)
c  in CNF:
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_2
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_1
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨  b^{26, 6}_0
c  in DIMACS:
 14513  14514  14515 -130 -14516 0
 14513  14514  14515 -130 -14517 0
 14513  14514  14515 -130  14518 0

c  1+1 --> 2
c    (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0 ∧  p_130) -> (-b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0)
c  in CNF:
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_2
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨  b^{26, 6}_1
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ -p_130 ∨ -b^{26, 6}_0
c  in DIMACS:
 14513  14514 -14515 -130 -14516 0
 14513  14514 -14515 -130  14517 0
 14513  14514 -14515 -130 -14518 0

c  2+1 --> break 
c    (-b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧  p_130) -> break
c  in CNF:
c     b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 14513 -14514  14515 -130 1162 0


c  2-1 --> 1
c    (-b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧ -p_130) -> (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0)
c  in CNF:
c     b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_2
c     b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_1
c     b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨  b^{26, 6}_0
c  in DIMACS:
 14513 -14514  14515  130 -14516 0
 14513 -14514  14515  130 -14517 0
 14513 -14514  14515  130  14518 0

c  1-1 --> 0
c    (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0 ∧ -p_130) -> (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧ -b^{26, 6}_0)
c  in CNF:
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_2
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_1
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_0
c  in DIMACS:
 14513  14514 -14515  130 -14516 0
 14513  14514 -14515  130 -14517 0
 14513  14514 -14515  130 -14518 0

c  0-1 --> -1
c    (-b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧ -p_130) -> ( b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0)
c  in CNF:
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨  b^{26, 6}_2
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_1
c     b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨  b^{26, 6}_0
c  in DIMACS:
 14513  14514  14515  130  14516 0
 14513  14514  14515  130 -14517 0
 14513  14514  14515  130  14518 0

c  -1-1 --> -2
c    ( b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧  b^{26, 5}_0 ∧ -p_130) -> ( b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0)
c  in CNF:
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨  b^{26, 6}_2
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨  b^{26, 6}_1
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨  p_130 ∨ -b^{26, 6}_0
c  in DIMACS:
-14513  14514 -14515  130  14516 0
-14513  14514 -14515  130  14517 0
-14513  14514 -14515  130 -14518 0

c  -2-1 --> break 
c    ( b^{26, 5}_2 ∧  b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨  b^{26, 5}_0 ∨  p_130 ∨ break
c  in DIMACS:
-14513 -14514  14515  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 5}_2 ∧ -b^{26, 5}_1 ∧ -b^{26, 5}_0 ∧ true) 
c  in CNF:
c    -b^{26, 5}_2 ∨  b^{26, 5}_1 ∨  b^{26, 5}_0 ∨ false 
c  in DIMACS:
-14513  14514  14515  0

c  3 does not represent an automaton state.
c    -(-b^{26, 5}_2 ∧  b^{26, 5}_1 ∧  b^{26, 5}_0 ∧ true) 
c  in CNF:
c     b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ false 
c  in DIMACS:
 14513 -14514 -14515  0
c  -3 does not represent an automaton state.
c    -( b^{26, 5}_2 ∧  b^{26, 5}_1 ∧  b^{26, 5}_0 ∧ true) 
c  in CNF:
c    -b^{26, 5}_2 ∨ -b^{26, 5}_1 ∨ -b^{26, 5}_0 ∨ false 
c  in DIMACS:
-14513 -14514 -14515  0

c i = 6
c  -2+1 --> -1
c    ( b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧  p_156) -> ( b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0)
c  in CNF:
c    -b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨  b^{26, 7}_2
c    -b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_1
c    -b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨  b^{26, 7}_0
c  in DIMACS:
-14516 -14517  14518 -156  14519 0
-14516 -14517  14518 -156 -14520 0
-14516 -14517  14518 -156  14521 0

c  -1+1 --> 0
c    ( b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0 ∧  p_156) -> (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧ -b^{26, 7}_0)
c  in CNF:
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_2
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_1
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_0
c  in DIMACS:
-14516  14517 -14518 -156 -14519 0
-14516  14517 -14518 -156 -14520 0
-14516  14517 -14518 -156 -14521 0

c  0+1 --> 1
c    (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧  p_156) -> (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0)
c  in CNF:
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_2
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_1
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨  b^{26, 7}_0
c  in DIMACS:
 14516  14517  14518 -156 -14519 0
 14516  14517  14518 -156 -14520 0
 14516  14517  14518 -156  14521 0

c  1+1 --> 2
c    (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0 ∧  p_156) -> (-b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0)
c  in CNF:
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_2
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨  b^{26, 7}_1
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ -p_156 ∨ -b^{26, 7}_0
c  in DIMACS:
 14516  14517 -14518 -156 -14519 0
 14516  14517 -14518 -156  14520 0
 14516  14517 -14518 -156 -14521 0

c  2+1 --> break 
c    (-b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧  p_156) -> break
c  in CNF:
c     b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 14516 -14517  14518 -156 1162 0


c  2-1 --> 1
c    (-b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧ -p_156) -> (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0)
c  in CNF:
c     b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_2
c     b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_1
c     b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨  b^{26, 7}_0
c  in DIMACS:
 14516 -14517  14518  156 -14519 0
 14516 -14517  14518  156 -14520 0
 14516 -14517  14518  156  14521 0

c  1-1 --> 0
c    (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0 ∧ -p_156) -> (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧ -b^{26, 7}_0)
c  in CNF:
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_2
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_1
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_0
c  in DIMACS:
 14516  14517 -14518  156 -14519 0
 14516  14517 -14518  156 -14520 0
 14516  14517 -14518  156 -14521 0

c  0-1 --> -1
c    (-b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧ -p_156) -> ( b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0)
c  in CNF:
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨  b^{26, 7}_2
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_1
c     b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨  b^{26, 7}_0
c  in DIMACS:
 14516  14517  14518  156  14519 0
 14516  14517  14518  156 -14520 0
 14516  14517  14518  156  14521 0

c  -1-1 --> -2
c    ( b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧  b^{26, 6}_0 ∧ -p_156) -> ( b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0)
c  in CNF:
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨  b^{26, 7}_2
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨  b^{26, 7}_1
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨  p_156 ∨ -b^{26, 7}_0
c  in DIMACS:
-14516  14517 -14518  156  14519 0
-14516  14517 -14518  156  14520 0
-14516  14517 -14518  156 -14521 0

c  -2-1 --> break 
c    ( b^{26, 6}_2 ∧  b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨  b^{26, 6}_0 ∨  p_156 ∨ break
c  in DIMACS:
-14516 -14517  14518  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 6}_2 ∧ -b^{26, 6}_1 ∧ -b^{26, 6}_0 ∧ true) 
c  in CNF:
c    -b^{26, 6}_2 ∨  b^{26, 6}_1 ∨  b^{26, 6}_0 ∨ false 
c  in DIMACS:
-14516  14517  14518  0

c  3 does not represent an automaton state.
c    -(-b^{26, 6}_2 ∧  b^{26, 6}_1 ∧  b^{26, 6}_0 ∧ true) 
c  in CNF:
c     b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ false 
c  in DIMACS:
 14516 -14517 -14518  0
c  -3 does not represent an automaton state.
c    -( b^{26, 6}_2 ∧  b^{26, 6}_1 ∧  b^{26, 6}_0 ∧ true) 
c  in CNF:
c    -b^{26, 6}_2 ∨ -b^{26, 6}_1 ∨ -b^{26, 6}_0 ∨ false 
c  in DIMACS:
-14516 -14517 -14518  0

c i = 7
c  -2+1 --> -1
c    ( b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧  p_182) -> ( b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0)
c  in CNF:
c    -b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨  b^{26, 8}_2
c    -b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_1
c    -b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨  b^{26, 8}_0
c  in DIMACS:
-14519 -14520  14521 -182  14522 0
-14519 -14520  14521 -182 -14523 0
-14519 -14520  14521 -182  14524 0

c  -1+1 --> 0
c    ( b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0 ∧  p_182) -> (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧ -b^{26, 8}_0)
c  in CNF:
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_2
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_1
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_0
c  in DIMACS:
-14519  14520 -14521 -182 -14522 0
-14519  14520 -14521 -182 -14523 0
-14519  14520 -14521 -182 -14524 0

c  0+1 --> 1
c    (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧  p_182) -> (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0)
c  in CNF:
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_2
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_1
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨  b^{26, 8}_0
c  in DIMACS:
 14519  14520  14521 -182 -14522 0
 14519  14520  14521 -182 -14523 0
 14519  14520  14521 -182  14524 0

c  1+1 --> 2
c    (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0 ∧  p_182) -> (-b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0)
c  in CNF:
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_2
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨  b^{26, 8}_1
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ -p_182 ∨ -b^{26, 8}_0
c  in DIMACS:
 14519  14520 -14521 -182 -14522 0
 14519  14520 -14521 -182  14523 0
 14519  14520 -14521 -182 -14524 0

c  2+1 --> break 
c    (-b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧  p_182) -> break
c  in CNF:
c     b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 14519 -14520  14521 -182 1162 0


c  2-1 --> 1
c    (-b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧ -p_182) -> (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0)
c  in CNF:
c     b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_2
c     b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_1
c     b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨  b^{26, 8}_0
c  in DIMACS:
 14519 -14520  14521  182 -14522 0
 14519 -14520  14521  182 -14523 0
 14519 -14520  14521  182  14524 0

c  1-1 --> 0
c    (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0 ∧ -p_182) -> (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧ -b^{26, 8}_0)
c  in CNF:
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_2
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_1
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_0
c  in DIMACS:
 14519  14520 -14521  182 -14522 0
 14519  14520 -14521  182 -14523 0
 14519  14520 -14521  182 -14524 0

c  0-1 --> -1
c    (-b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧ -p_182) -> ( b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0)
c  in CNF:
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨  b^{26, 8}_2
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_1
c     b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨  b^{26, 8}_0
c  in DIMACS:
 14519  14520  14521  182  14522 0
 14519  14520  14521  182 -14523 0
 14519  14520  14521  182  14524 0

c  -1-1 --> -2
c    ( b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧  b^{26, 7}_0 ∧ -p_182) -> ( b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0)
c  in CNF:
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨  b^{26, 8}_2
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨  b^{26, 8}_1
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨  p_182 ∨ -b^{26, 8}_0
c  in DIMACS:
-14519  14520 -14521  182  14522 0
-14519  14520 -14521  182  14523 0
-14519  14520 -14521  182 -14524 0

c  -2-1 --> break 
c    ( b^{26, 7}_2 ∧  b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨  b^{26, 7}_0 ∨  p_182 ∨ break
c  in DIMACS:
-14519 -14520  14521  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 7}_2 ∧ -b^{26, 7}_1 ∧ -b^{26, 7}_0 ∧ true) 
c  in CNF:
c    -b^{26, 7}_2 ∨  b^{26, 7}_1 ∨  b^{26, 7}_0 ∨ false 
c  in DIMACS:
-14519  14520  14521  0

c  3 does not represent an automaton state.
c    -(-b^{26, 7}_2 ∧  b^{26, 7}_1 ∧  b^{26, 7}_0 ∧ true) 
c  in CNF:
c     b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ false 
c  in DIMACS:
 14519 -14520 -14521  0
c  -3 does not represent an automaton state.
c    -( b^{26, 7}_2 ∧  b^{26, 7}_1 ∧  b^{26, 7}_0 ∧ true) 
c  in CNF:
c    -b^{26, 7}_2 ∨ -b^{26, 7}_1 ∨ -b^{26, 7}_0 ∨ false 
c  in DIMACS:
-14519 -14520 -14521  0

c i = 8
c  -2+1 --> -1
c    ( b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧  p_208) -> ( b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0)
c  in CNF:
c    -b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨  b^{26, 9}_2
c    -b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_1
c    -b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨  b^{26, 9}_0
c  in DIMACS:
-14522 -14523  14524 -208  14525 0
-14522 -14523  14524 -208 -14526 0
-14522 -14523  14524 -208  14527 0

c  -1+1 --> 0
c    ( b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0 ∧  p_208) -> (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧ -b^{26, 9}_0)
c  in CNF:
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_2
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_1
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_0
c  in DIMACS:
-14522  14523 -14524 -208 -14525 0
-14522  14523 -14524 -208 -14526 0
-14522  14523 -14524 -208 -14527 0

c  0+1 --> 1
c    (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧  p_208) -> (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0)
c  in CNF:
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_2
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_1
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨  b^{26, 9}_0
c  in DIMACS:
 14522  14523  14524 -208 -14525 0
 14522  14523  14524 -208 -14526 0
 14522  14523  14524 -208  14527 0

c  1+1 --> 2
c    (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0 ∧  p_208) -> (-b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0)
c  in CNF:
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_2
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨  b^{26, 9}_1
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ -p_208 ∨ -b^{26, 9}_0
c  in DIMACS:
 14522  14523 -14524 -208 -14525 0
 14522  14523 -14524 -208  14526 0
 14522  14523 -14524 -208 -14527 0

c  2+1 --> break 
c    (-b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧  p_208) -> break
c  in CNF:
c     b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 14522 -14523  14524 -208 1162 0


c  2-1 --> 1
c    (-b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧ -p_208) -> (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0)
c  in CNF:
c     b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_2
c     b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_1
c     b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨  b^{26, 9}_0
c  in DIMACS:
 14522 -14523  14524  208 -14525 0
 14522 -14523  14524  208 -14526 0
 14522 -14523  14524  208  14527 0

c  1-1 --> 0
c    (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0 ∧ -p_208) -> (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧ -b^{26, 9}_0)
c  in CNF:
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_2
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_1
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_0
c  in DIMACS:
 14522  14523 -14524  208 -14525 0
 14522  14523 -14524  208 -14526 0
 14522  14523 -14524  208 -14527 0

c  0-1 --> -1
c    (-b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧ -p_208) -> ( b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0)
c  in CNF:
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨  b^{26, 9}_2
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_1
c     b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨  b^{26, 9}_0
c  in DIMACS:
 14522  14523  14524  208  14525 0
 14522  14523  14524  208 -14526 0
 14522  14523  14524  208  14527 0

c  -1-1 --> -2
c    ( b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧  b^{26, 8}_0 ∧ -p_208) -> ( b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0)
c  in CNF:
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨  b^{26, 9}_2
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨  b^{26, 9}_1
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨  p_208 ∨ -b^{26, 9}_0
c  in DIMACS:
-14522  14523 -14524  208  14525 0
-14522  14523 -14524  208  14526 0
-14522  14523 -14524  208 -14527 0

c  -2-1 --> break 
c    ( b^{26, 8}_2 ∧  b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨  b^{26, 8}_0 ∨  p_208 ∨ break
c  in DIMACS:
-14522 -14523  14524  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 8}_2 ∧ -b^{26, 8}_1 ∧ -b^{26, 8}_0 ∧ true) 
c  in CNF:
c    -b^{26, 8}_2 ∨  b^{26, 8}_1 ∨  b^{26, 8}_0 ∨ false 
c  in DIMACS:
-14522  14523  14524  0

c  3 does not represent an automaton state.
c    -(-b^{26, 8}_2 ∧  b^{26, 8}_1 ∧  b^{26, 8}_0 ∧ true) 
c  in CNF:
c     b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ false 
c  in DIMACS:
 14522 -14523 -14524  0
c  -3 does not represent an automaton state.
c    -( b^{26, 8}_2 ∧  b^{26, 8}_1 ∧  b^{26, 8}_0 ∧ true) 
c  in CNF:
c    -b^{26, 8}_2 ∨ -b^{26, 8}_1 ∨ -b^{26, 8}_0 ∨ false 
c  in DIMACS:
-14522 -14523 -14524  0

c i = 9
c  -2+1 --> -1
c    ( b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧  p_234) -> ( b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0)
c  in CNF:
c    -b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨  b^{26, 10}_2
c    -b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_1
c    -b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨  b^{26, 10}_0
c  in DIMACS:
-14525 -14526  14527 -234  14528 0
-14525 -14526  14527 -234 -14529 0
-14525 -14526  14527 -234  14530 0

c  -1+1 --> 0
c    ( b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0 ∧  p_234) -> (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧ -b^{26, 10}_0)
c  in CNF:
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_2
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_1
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_0
c  in DIMACS:
-14525  14526 -14527 -234 -14528 0
-14525  14526 -14527 -234 -14529 0
-14525  14526 -14527 -234 -14530 0

c  0+1 --> 1
c    (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧  p_234) -> (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0)
c  in CNF:
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_2
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_1
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨  b^{26, 10}_0
c  in DIMACS:
 14525  14526  14527 -234 -14528 0
 14525  14526  14527 -234 -14529 0
 14525  14526  14527 -234  14530 0

c  1+1 --> 2
c    (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0 ∧  p_234) -> (-b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0)
c  in CNF:
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_2
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨  b^{26, 10}_1
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ -p_234 ∨ -b^{26, 10}_0
c  in DIMACS:
 14525  14526 -14527 -234 -14528 0
 14525  14526 -14527 -234  14529 0
 14525  14526 -14527 -234 -14530 0

c  2+1 --> break 
c    (-b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧  p_234) -> break
c  in CNF:
c     b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 14525 -14526  14527 -234 1162 0


c  2-1 --> 1
c    (-b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧ -p_234) -> (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0)
c  in CNF:
c     b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_2
c     b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_1
c     b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨  b^{26, 10}_0
c  in DIMACS:
 14525 -14526  14527  234 -14528 0
 14525 -14526  14527  234 -14529 0
 14525 -14526  14527  234  14530 0

c  1-1 --> 0
c    (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0 ∧ -p_234) -> (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧ -b^{26, 10}_0)
c  in CNF:
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_2
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_1
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_0
c  in DIMACS:
 14525  14526 -14527  234 -14528 0
 14525  14526 -14527  234 -14529 0
 14525  14526 -14527  234 -14530 0

c  0-1 --> -1
c    (-b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧ -p_234) -> ( b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0)
c  in CNF:
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨  b^{26, 10}_2
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_1
c     b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨  b^{26, 10}_0
c  in DIMACS:
 14525  14526  14527  234  14528 0
 14525  14526  14527  234 -14529 0
 14525  14526  14527  234  14530 0

c  -1-1 --> -2
c    ( b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧  b^{26, 9}_0 ∧ -p_234) -> ( b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0)
c  in CNF:
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨  b^{26, 10}_2
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨  b^{26, 10}_1
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨  p_234 ∨ -b^{26, 10}_0
c  in DIMACS:
-14525  14526 -14527  234  14528 0
-14525  14526 -14527  234  14529 0
-14525  14526 -14527  234 -14530 0

c  -2-1 --> break 
c    ( b^{26, 9}_2 ∧  b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨  b^{26, 9}_0 ∨  p_234 ∨ break
c  in DIMACS:
-14525 -14526  14527  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 9}_2 ∧ -b^{26, 9}_1 ∧ -b^{26, 9}_0 ∧ true) 
c  in CNF:
c    -b^{26, 9}_2 ∨  b^{26, 9}_1 ∨  b^{26, 9}_0 ∨ false 
c  in DIMACS:
-14525  14526  14527  0

c  3 does not represent an automaton state.
c    -(-b^{26, 9}_2 ∧  b^{26, 9}_1 ∧  b^{26, 9}_0 ∧ true) 
c  in CNF:
c     b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ false 
c  in DIMACS:
 14525 -14526 -14527  0
c  -3 does not represent an automaton state.
c    -( b^{26, 9}_2 ∧  b^{26, 9}_1 ∧  b^{26, 9}_0 ∧ true) 
c  in CNF:
c    -b^{26, 9}_2 ∨ -b^{26, 9}_1 ∨ -b^{26, 9}_0 ∨ false 
c  in DIMACS:
-14525 -14526 -14527  0

c i = 10
c  -2+1 --> -1
c    ( b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧  p_260) -> ( b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0)
c  in CNF:
c    -b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨  b^{26, 11}_2
c    -b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_1
c    -b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨  b^{26, 11}_0
c  in DIMACS:
-14528 -14529  14530 -260  14531 0
-14528 -14529  14530 -260 -14532 0
-14528 -14529  14530 -260  14533 0

c  -1+1 --> 0
c    ( b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0 ∧  p_260) -> (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧ -b^{26, 11}_0)
c  in CNF:
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_2
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_1
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_0
c  in DIMACS:
-14528  14529 -14530 -260 -14531 0
-14528  14529 -14530 -260 -14532 0
-14528  14529 -14530 -260 -14533 0

c  0+1 --> 1
c    (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧  p_260) -> (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0)
c  in CNF:
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_2
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_1
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨  b^{26, 11}_0
c  in DIMACS:
 14528  14529  14530 -260 -14531 0
 14528  14529  14530 -260 -14532 0
 14528  14529  14530 -260  14533 0

c  1+1 --> 2
c    (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0 ∧  p_260) -> (-b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0)
c  in CNF:
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_2
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨  b^{26, 11}_1
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ -p_260 ∨ -b^{26, 11}_0
c  in DIMACS:
 14528  14529 -14530 -260 -14531 0
 14528  14529 -14530 -260  14532 0
 14528  14529 -14530 -260 -14533 0

c  2+1 --> break 
c    (-b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧  p_260) -> break
c  in CNF:
c     b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 14528 -14529  14530 -260 1162 0


c  2-1 --> 1
c    (-b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧ -p_260) -> (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0)
c  in CNF:
c     b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_2
c     b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_1
c     b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨  b^{26, 11}_0
c  in DIMACS:
 14528 -14529  14530  260 -14531 0
 14528 -14529  14530  260 -14532 0
 14528 -14529  14530  260  14533 0

c  1-1 --> 0
c    (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0 ∧ -p_260) -> (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧ -b^{26, 11}_0)
c  in CNF:
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_2
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_1
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_0
c  in DIMACS:
 14528  14529 -14530  260 -14531 0
 14528  14529 -14530  260 -14532 0
 14528  14529 -14530  260 -14533 0

c  0-1 --> -1
c    (-b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧ -p_260) -> ( b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0)
c  in CNF:
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨  b^{26, 11}_2
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_1
c     b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨  b^{26, 11}_0
c  in DIMACS:
 14528  14529  14530  260  14531 0
 14528  14529  14530  260 -14532 0
 14528  14529  14530  260  14533 0

c  -1-1 --> -2
c    ( b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧  b^{26, 10}_0 ∧ -p_260) -> ( b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0)
c  in CNF:
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨  b^{26, 11}_2
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨  b^{26, 11}_1
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨  p_260 ∨ -b^{26, 11}_0
c  in DIMACS:
-14528  14529 -14530  260  14531 0
-14528  14529 -14530  260  14532 0
-14528  14529 -14530  260 -14533 0

c  -2-1 --> break 
c    ( b^{26, 10}_2 ∧  b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨  b^{26, 10}_0 ∨  p_260 ∨ break
c  in DIMACS:
-14528 -14529  14530  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 10}_2 ∧ -b^{26, 10}_1 ∧ -b^{26, 10}_0 ∧ true) 
c  in CNF:
c    -b^{26, 10}_2 ∨  b^{26, 10}_1 ∨  b^{26, 10}_0 ∨ false 
c  in DIMACS:
-14528  14529  14530  0

c  3 does not represent an automaton state.
c    -(-b^{26, 10}_2 ∧  b^{26, 10}_1 ∧  b^{26, 10}_0 ∧ true) 
c  in CNF:
c     b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ false 
c  in DIMACS:
 14528 -14529 -14530  0
c  -3 does not represent an automaton state.
c    -( b^{26, 10}_2 ∧  b^{26, 10}_1 ∧  b^{26, 10}_0 ∧ true) 
c  in CNF:
c    -b^{26, 10}_2 ∨ -b^{26, 10}_1 ∨ -b^{26, 10}_0 ∨ false 
c  in DIMACS:
-14528 -14529 -14530  0

c i = 11
c  -2+1 --> -1
c    ( b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧  p_286) -> ( b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0)
c  in CNF:
c    -b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨  b^{26, 12}_2
c    -b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_1
c    -b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨  b^{26, 12}_0
c  in DIMACS:
-14531 -14532  14533 -286  14534 0
-14531 -14532  14533 -286 -14535 0
-14531 -14532  14533 -286  14536 0

c  -1+1 --> 0
c    ( b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0 ∧  p_286) -> (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧ -b^{26, 12}_0)
c  in CNF:
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_2
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_1
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_0
c  in DIMACS:
-14531  14532 -14533 -286 -14534 0
-14531  14532 -14533 -286 -14535 0
-14531  14532 -14533 -286 -14536 0

c  0+1 --> 1
c    (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧  p_286) -> (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0)
c  in CNF:
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_2
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_1
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨  b^{26, 12}_0
c  in DIMACS:
 14531  14532  14533 -286 -14534 0
 14531  14532  14533 -286 -14535 0
 14531  14532  14533 -286  14536 0

c  1+1 --> 2
c    (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0 ∧  p_286) -> (-b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0)
c  in CNF:
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_2
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨  b^{26, 12}_1
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ -p_286 ∨ -b^{26, 12}_0
c  in DIMACS:
 14531  14532 -14533 -286 -14534 0
 14531  14532 -14533 -286  14535 0
 14531  14532 -14533 -286 -14536 0

c  2+1 --> break 
c    (-b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧  p_286) -> break
c  in CNF:
c     b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 14531 -14532  14533 -286 1162 0


c  2-1 --> 1
c    (-b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧ -p_286) -> (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0)
c  in CNF:
c     b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_2
c     b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_1
c     b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨  b^{26, 12}_0
c  in DIMACS:
 14531 -14532  14533  286 -14534 0
 14531 -14532  14533  286 -14535 0
 14531 -14532  14533  286  14536 0

c  1-1 --> 0
c    (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0 ∧ -p_286) -> (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧ -b^{26, 12}_0)
c  in CNF:
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_2
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_1
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_0
c  in DIMACS:
 14531  14532 -14533  286 -14534 0
 14531  14532 -14533  286 -14535 0
 14531  14532 -14533  286 -14536 0

c  0-1 --> -1
c    (-b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧ -p_286) -> ( b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0)
c  in CNF:
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨  b^{26, 12}_2
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_1
c     b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨  b^{26, 12}_0
c  in DIMACS:
 14531  14532  14533  286  14534 0
 14531  14532  14533  286 -14535 0
 14531  14532  14533  286  14536 0

c  -1-1 --> -2
c    ( b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧  b^{26, 11}_0 ∧ -p_286) -> ( b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0)
c  in CNF:
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨  b^{26, 12}_2
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨  b^{26, 12}_1
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨  p_286 ∨ -b^{26, 12}_0
c  in DIMACS:
-14531  14532 -14533  286  14534 0
-14531  14532 -14533  286  14535 0
-14531  14532 -14533  286 -14536 0

c  -2-1 --> break 
c    ( b^{26, 11}_2 ∧  b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨  b^{26, 11}_0 ∨  p_286 ∨ break
c  in DIMACS:
-14531 -14532  14533  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 11}_2 ∧ -b^{26, 11}_1 ∧ -b^{26, 11}_0 ∧ true) 
c  in CNF:
c    -b^{26, 11}_2 ∨  b^{26, 11}_1 ∨  b^{26, 11}_0 ∨ false 
c  in DIMACS:
-14531  14532  14533  0

c  3 does not represent an automaton state.
c    -(-b^{26, 11}_2 ∧  b^{26, 11}_1 ∧  b^{26, 11}_0 ∧ true) 
c  in CNF:
c     b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ false 
c  in DIMACS:
 14531 -14532 -14533  0
c  -3 does not represent an automaton state.
c    -( b^{26, 11}_2 ∧  b^{26, 11}_1 ∧  b^{26, 11}_0 ∧ true) 
c  in CNF:
c    -b^{26, 11}_2 ∨ -b^{26, 11}_1 ∨ -b^{26, 11}_0 ∨ false 
c  in DIMACS:
-14531 -14532 -14533  0

c i = 12
c  -2+1 --> -1
c    ( b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧  p_312) -> ( b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0)
c  in CNF:
c    -b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨  b^{26, 13}_2
c    -b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_1
c    -b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨  b^{26, 13}_0
c  in DIMACS:
-14534 -14535  14536 -312  14537 0
-14534 -14535  14536 -312 -14538 0
-14534 -14535  14536 -312  14539 0

c  -1+1 --> 0
c    ( b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0 ∧  p_312) -> (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧ -b^{26, 13}_0)
c  in CNF:
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_2
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_1
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_0
c  in DIMACS:
-14534  14535 -14536 -312 -14537 0
-14534  14535 -14536 -312 -14538 0
-14534  14535 -14536 -312 -14539 0

c  0+1 --> 1
c    (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧  p_312) -> (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0)
c  in CNF:
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_2
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_1
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨  b^{26, 13}_0
c  in DIMACS:
 14534  14535  14536 -312 -14537 0
 14534  14535  14536 -312 -14538 0
 14534  14535  14536 -312  14539 0

c  1+1 --> 2
c    (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0 ∧  p_312) -> (-b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0)
c  in CNF:
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_2
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨  b^{26, 13}_1
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ -p_312 ∨ -b^{26, 13}_0
c  in DIMACS:
 14534  14535 -14536 -312 -14537 0
 14534  14535 -14536 -312  14538 0
 14534  14535 -14536 -312 -14539 0

c  2+1 --> break 
c    (-b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧  p_312) -> break
c  in CNF:
c     b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 14534 -14535  14536 -312 1162 0


c  2-1 --> 1
c    (-b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧ -p_312) -> (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0)
c  in CNF:
c     b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_2
c     b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_1
c     b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨  b^{26, 13}_0
c  in DIMACS:
 14534 -14535  14536  312 -14537 0
 14534 -14535  14536  312 -14538 0
 14534 -14535  14536  312  14539 0

c  1-1 --> 0
c    (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0 ∧ -p_312) -> (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧ -b^{26, 13}_0)
c  in CNF:
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_2
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_1
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_0
c  in DIMACS:
 14534  14535 -14536  312 -14537 0
 14534  14535 -14536  312 -14538 0
 14534  14535 -14536  312 -14539 0

c  0-1 --> -1
c    (-b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧ -p_312) -> ( b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0)
c  in CNF:
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨  b^{26, 13}_2
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_1
c     b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨  b^{26, 13}_0
c  in DIMACS:
 14534  14535  14536  312  14537 0
 14534  14535  14536  312 -14538 0
 14534  14535  14536  312  14539 0

c  -1-1 --> -2
c    ( b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧  b^{26, 12}_0 ∧ -p_312) -> ( b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0)
c  in CNF:
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨  b^{26, 13}_2
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨  b^{26, 13}_1
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨  p_312 ∨ -b^{26, 13}_0
c  in DIMACS:
-14534  14535 -14536  312  14537 0
-14534  14535 -14536  312  14538 0
-14534  14535 -14536  312 -14539 0

c  -2-1 --> break 
c    ( b^{26, 12}_2 ∧  b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨  b^{26, 12}_0 ∨  p_312 ∨ break
c  in DIMACS:
-14534 -14535  14536  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 12}_2 ∧ -b^{26, 12}_1 ∧ -b^{26, 12}_0 ∧ true) 
c  in CNF:
c    -b^{26, 12}_2 ∨  b^{26, 12}_1 ∨  b^{26, 12}_0 ∨ false 
c  in DIMACS:
-14534  14535  14536  0

c  3 does not represent an automaton state.
c    -(-b^{26, 12}_2 ∧  b^{26, 12}_1 ∧  b^{26, 12}_0 ∧ true) 
c  in CNF:
c     b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ false 
c  in DIMACS:
 14534 -14535 -14536  0
c  -3 does not represent an automaton state.
c    -( b^{26, 12}_2 ∧  b^{26, 12}_1 ∧  b^{26, 12}_0 ∧ true) 
c  in CNF:
c    -b^{26, 12}_2 ∨ -b^{26, 12}_1 ∨ -b^{26, 12}_0 ∨ false 
c  in DIMACS:
-14534 -14535 -14536  0

c i = 13
c  -2+1 --> -1
c    ( b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧  p_338) -> ( b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0)
c  in CNF:
c    -b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨  b^{26, 14}_2
c    -b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_1
c    -b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨  b^{26, 14}_0
c  in DIMACS:
-14537 -14538  14539 -338  14540 0
-14537 -14538  14539 -338 -14541 0
-14537 -14538  14539 -338  14542 0

c  -1+1 --> 0
c    ( b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0 ∧  p_338) -> (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧ -b^{26, 14}_0)
c  in CNF:
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_2
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_1
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_0
c  in DIMACS:
-14537  14538 -14539 -338 -14540 0
-14537  14538 -14539 -338 -14541 0
-14537  14538 -14539 -338 -14542 0

c  0+1 --> 1
c    (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧  p_338) -> (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0)
c  in CNF:
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_2
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_1
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨  b^{26, 14}_0
c  in DIMACS:
 14537  14538  14539 -338 -14540 0
 14537  14538  14539 -338 -14541 0
 14537  14538  14539 -338  14542 0

c  1+1 --> 2
c    (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0 ∧  p_338) -> (-b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0)
c  in CNF:
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_2
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨  b^{26, 14}_1
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ -p_338 ∨ -b^{26, 14}_0
c  in DIMACS:
 14537  14538 -14539 -338 -14540 0
 14537  14538 -14539 -338  14541 0
 14537  14538 -14539 -338 -14542 0

c  2+1 --> break 
c    (-b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧  p_338) -> break
c  in CNF:
c     b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 14537 -14538  14539 -338 1162 0


c  2-1 --> 1
c    (-b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧ -p_338) -> (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0)
c  in CNF:
c     b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_2
c     b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_1
c     b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨  b^{26, 14}_0
c  in DIMACS:
 14537 -14538  14539  338 -14540 0
 14537 -14538  14539  338 -14541 0
 14537 -14538  14539  338  14542 0

c  1-1 --> 0
c    (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0 ∧ -p_338) -> (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧ -b^{26, 14}_0)
c  in CNF:
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_2
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_1
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_0
c  in DIMACS:
 14537  14538 -14539  338 -14540 0
 14537  14538 -14539  338 -14541 0
 14537  14538 -14539  338 -14542 0

c  0-1 --> -1
c    (-b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧ -p_338) -> ( b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0)
c  in CNF:
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨  b^{26, 14}_2
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_1
c     b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨  b^{26, 14}_0
c  in DIMACS:
 14537  14538  14539  338  14540 0
 14537  14538  14539  338 -14541 0
 14537  14538  14539  338  14542 0

c  -1-1 --> -2
c    ( b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧  b^{26, 13}_0 ∧ -p_338) -> ( b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0)
c  in CNF:
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨  b^{26, 14}_2
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨  b^{26, 14}_1
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨  p_338 ∨ -b^{26, 14}_0
c  in DIMACS:
-14537  14538 -14539  338  14540 0
-14537  14538 -14539  338  14541 0
-14537  14538 -14539  338 -14542 0

c  -2-1 --> break 
c    ( b^{26, 13}_2 ∧  b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨  b^{26, 13}_0 ∨  p_338 ∨ break
c  in DIMACS:
-14537 -14538  14539  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 13}_2 ∧ -b^{26, 13}_1 ∧ -b^{26, 13}_0 ∧ true) 
c  in CNF:
c    -b^{26, 13}_2 ∨  b^{26, 13}_1 ∨  b^{26, 13}_0 ∨ false 
c  in DIMACS:
-14537  14538  14539  0

c  3 does not represent an automaton state.
c    -(-b^{26, 13}_2 ∧  b^{26, 13}_1 ∧  b^{26, 13}_0 ∧ true) 
c  in CNF:
c     b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ false 
c  in DIMACS:
 14537 -14538 -14539  0
c  -3 does not represent an automaton state.
c    -( b^{26, 13}_2 ∧  b^{26, 13}_1 ∧  b^{26, 13}_0 ∧ true) 
c  in CNF:
c    -b^{26, 13}_2 ∨ -b^{26, 13}_1 ∨ -b^{26, 13}_0 ∨ false 
c  in DIMACS:
-14537 -14538 -14539  0

c i = 14
c  -2+1 --> -1
c    ( b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧  p_364) -> ( b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0)
c  in CNF:
c    -b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨  b^{26, 15}_2
c    -b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_1
c    -b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨  b^{26, 15}_0
c  in DIMACS:
-14540 -14541  14542 -364  14543 0
-14540 -14541  14542 -364 -14544 0
-14540 -14541  14542 -364  14545 0

c  -1+1 --> 0
c    ( b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0 ∧  p_364) -> (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧ -b^{26, 15}_0)
c  in CNF:
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_2
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_1
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_0
c  in DIMACS:
-14540  14541 -14542 -364 -14543 0
-14540  14541 -14542 -364 -14544 0
-14540  14541 -14542 -364 -14545 0

c  0+1 --> 1
c    (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧  p_364) -> (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0)
c  in CNF:
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_2
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_1
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨  b^{26, 15}_0
c  in DIMACS:
 14540  14541  14542 -364 -14543 0
 14540  14541  14542 -364 -14544 0
 14540  14541  14542 -364  14545 0

c  1+1 --> 2
c    (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0 ∧  p_364) -> (-b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0)
c  in CNF:
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_2
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨  b^{26, 15}_1
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ -p_364 ∨ -b^{26, 15}_0
c  in DIMACS:
 14540  14541 -14542 -364 -14543 0
 14540  14541 -14542 -364  14544 0
 14540  14541 -14542 -364 -14545 0

c  2+1 --> break 
c    (-b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧  p_364) -> break
c  in CNF:
c     b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 14540 -14541  14542 -364 1162 0


c  2-1 --> 1
c    (-b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧ -p_364) -> (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0)
c  in CNF:
c     b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_2
c     b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_1
c     b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨  b^{26, 15}_0
c  in DIMACS:
 14540 -14541  14542  364 -14543 0
 14540 -14541  14542  364 -14544 0
 14540 -14541  14542  364  14545 0

c  1-1 --> 0
c    (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0 ∧ -p_364) -> (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧ -b^{26, 15}_0)
c  in CNF:
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_2
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_1
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_0
c  in DIMACS:
 14540  14541 -14542  364 -14543 0
 14540  14541 -14542  364 -14544 0
 14540  14541 -14542  364 -14545 0

c  0-1 --> -1
c    (-b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧ -p_364) -> ( b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0)
c  in CNF:
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨  b^{26, 15}_2
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_1
c     b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨  b^{26, 15}_0
c  in DIMACS:
 14540  14541  14542  364  14543 0
 14540  14541  14542  364 -14544 0
 14540  14541  14542  364  14545 0

c  -1-1 --> -2
c    ( b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧  b^{26, 14}_0 ∧ -p_364) -> ( b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0)
c  in CNF:
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨  b^{26, 15}_2
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨  b^{26, 15}_1
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨  p_364 ∨ -b^{26, 15}_0
c  in DIMACS:
-14540  14541 -14542  364  14543 0
-14540  14541 -14542  364  14544 0
-14540  14541 -14542  364 -14545 0

c  -2-1 --> break 
c    ( b^{26, 14}_2 ∧  b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨  b^{26, 14}_0 ∨  p_364 ∨ break
c  in DIMACS:
-14540 -14541  14542  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 14}_2 ∧ -b^{26, 14}_1 ∧ -b^{26, 14}_0 ∧ true) 
c  in CNF:
c    -b^{26, 14}_2 ∨  b^{26, 14}_1 ∨  b^{26, 14}_0 ∨ false 
c  in DIMACS:
-14540  14541  14542  0

c  3 does not represent an automaton state.
c    -(-b^{26, 14}_2 ∧  b^{26, 14}_1 ∧  b^{26, 14}_0 ∧ true) 
c  in CNF:
c     b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ false 
c  in DIMACS:
 14540 -14541 -14542  0
c  -3 does not represent an automaton state.
c    -( b^{26, 14}_2 ∧  b^{26, 14}_1 ∧  b^{26, 14}_0 ∧ true) 
c  in CNF:
c    -b^{26, 14}_2 ∨ -b^{26, 14}_1 ∨ -b^{26, 14}_0 ∨ false 
c  in DIMACS:
-14540 -14541 -14542  0

c i = 15
c  -2+1 --> -1
c    ( b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧  p_390) -> ( b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0)
c  in CNF:
c    -b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨  b^{26, 16}_2
c    -b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_1
c    -b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨  b^{26, 16}_0
c  in DIMACS:
-14543 -14544  14545 -390  14546 0
-14543 -14544  14545 -390 -14547 0
-14543 -14544  14545 -390  14548 0

c  -1+1 --> 0
c    ( b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0 ∧  p_390) -> (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧ -b^{26, 16}_0)
c  in CNF:
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_2
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_1
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_0
c  in DIMACS:
-14543  14544 -14545 -390 -14546 0
-14543  14544 -14545 -390 -14547 0
-14543  14544 -14545 -390 -14548 0

c  0+1 --> 1
c    (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧  p_390) -> (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0)
c  in CNF:
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_2
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_1
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨  b^{26, 16}_0
c  in DIMACS:
 14543  14544  14545 -390 -14546 0
 14543  14544  14545 -390 -14547 0
 14543  14544  14545 -390  14548 0

c  1+1 --> 2
c    (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0 ∧  p_390) -> (-b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0)
c  in CNF:
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_2
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨  b^{26, 16}_1
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ -p_390 ∨ -b^{26, 16}_0
c  in DIMACS:
 14543  14544 -14545 -390 -14546 0
 14543  14544 -14545 -390  14547 0
 14543  14544 -14545 -390 -14548 0

c  2+1 --> break 
c    (-b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧  p_390) -> break
c  in CNF:
c     b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 14543 -14544  14545 -390 1162 0


c  2-1 --> 1
c    (-b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧ -p_390) -> (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0)
c  in CNF:
c     b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_2
c     b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_1
c     b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨  b^{26, 16}_0
c  in DIMACS:
 14543 -14544  14545  390 -14546 0
 14543 -14544  14545  390 -14547 0
 14543 -14544  14545  390  14548 0

c  1-1 --> 0
c    (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0 ∧ -p_390) -> (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧ -b^{26, 16}_0)
c  in CNF:
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_2
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_1
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_0
c  in DIMACS:
 14543  14544 -14545  390 -14546 0
 14543  14544 -14545  390 -14547 0
 14543  14544 -14545  390 -14548 0

c  0-1 --> -1
c    (-b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧ -p_390) -> ( b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0)
c  in CNF:
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨  b^{26, 16}_2
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_1
c     b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨  b^{26, 16}_0
c  in DIMACS:
 14543  14544  14545  390  14546 0
 14543  14544  14545  390 -14547 0
 14543  14544  14545  390  14548 0

c  -1-1 --> -2
c    ( b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧  b^{26, 15}_0 ∧ -p_390) -> ( b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0)
c  in CNF:
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨  b^{26, 16}_2
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨  b^{26, 16}_1
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨  p_390 ∨ -b^{26, 16}_0
c  in DIMACS:
-14543  14544 -14545  390  14546 0
-14543  14544 -14545  390  14547 0
-14543  14544 -14545  390 -14548 0

c  -2-1 --> break 
c    ( b^{26, 15}_2 ∧  b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨  b^{26, 15}_0 ∨  p_390 ∨ break
c  in DIMACS:
-14543 -14544  14545  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 15}_2 ∧ -b^{26, 15}_1 ∧ -b^{26, 15}_0 ∧ true) 
c  in CNF:
c    -b^{26, 15}_2 ∨  b^{26, 15}_1 ∨  b^{26, 15}_0 ∨ false 
c  in DIMACS:
-14543  14544  14545  0

c  3 does not represent an automaton state.
c    -(-b^{26, 15}_2 ∧  b^{26, 15}_1 ∧  b^{26, 15}_0 ∧ true) 
c  in CNF:
c     b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ false 
c  in DIMACS:
 14543 -14544 -14545  0
c  -3 does not represent an automaton state.
c    -( b^{26, 15}_2 ∧  b^{26, 15}_1 ∧  b^{26, 15}_0 ∧ true) 
c  in CNF:
c    -b^{26, 15}_2 ∨ -b^{26, 15}_1 ∨ -b^{26, 15}_0 ∨ false 
c  in DIMACS:
-14543 -14544 -14545  0

c i = 16
c  -2+1 --> -1
c    ( b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧  p_416) -> ( b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0)
c  in CNF:
c    -b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨  b^{26, 17}_2
c    -b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_1
c    -b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨  b^{26, 17}_0
c  in DIMACS:
-14546 -14547  14548 -416  14549 0
-14546 -14547  14548 -416 -14550 0
-14546 -14547  14548 -416  14551 0

c  -1+1 --> 0
c    ( b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0 ∧  p_416) -> (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧ -b^{26, 17}_0)
c  in CNF:
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_2
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_1
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_0
c  in DIMACS:
-14546  14547 -14548 -416 -14549 0
-14546  14547 -14548 -416 -14550 0
-14546  14547 -14548 -416 -14551 0

c  0+1 --> 1
c    (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧  p_416) -> (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0)
c  in CNF:
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_2
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_1
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨  b^{26, 17}_0
c  in DIMACS:
 14546  14547  14548 -416 -14549 0
 14546  14547  14548 -416 -14550 0
 14546  14547  14548 -416  14551 0

c  1+1 --> 2
c    (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0 ∧  p_416) -> (-b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0)
c  in CNF:
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_2
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨  b^{26, 17}_1
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ -p_416 ∨ -b^{26, 17}_0
c  in DIMACS:
 14546  14547 -14548 -416 -14549 0
 14546  14547 -14548 -416  14550 0
 14546  14547 -14548 -416 -14551 0

c  2+1 --> break 
c    (-b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧  p_416) -> break
c  in CNF:
c     b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 14546 -14547  14548 -416 1162 0


c  2-1 --> 1
c    (-b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧ -p_416) -> (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0)
c  in CNF:
c     b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_2
c     b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_1
c     b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨  b^{26, 17}_0
c  in DIMACS:
 14546 -14547  14548  416 -14549 0
 14546 -14547  14548  416 -14550 0
 14546 -14547  14548  416  14551 0

c  1-1 --> 0
c    (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0 ∧ -p_416) -> (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧ -b^{26, 17}_0)
c  in CNF:
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_2
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_1
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_0
c  in DIMACS:
 14546  14547 -14548  416 -14549 0
 14546  14547 -14548  416 -14550 0
 14546  14547 -14548  416 -14551 0

c  0-1 --> -1
c    (-b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧ -p_416) -> ( b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0)
c  in CNF:
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨  b^{26, 17}_2
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_1
c     b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨  b^{26, 17}_0
c  in DIMACS:
 14546  14547  14548  416  14549 0
 14546  14547  14548  416 -14550 0
 14546  14547  14548  416  14551 0

c  -1-1 --> -2
c    ( b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧  b^{26, 16}_0 ∧ -p_416) -> ( b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0)
c  in CNF:
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨  b^{26, 17}_2
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨  b^{26, 17}_1
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨  p_416 ∨ -b^{26, 17}_0
c  in DIMACS:
-14546  14547 -14548  416  14549 0
-14546  14547 -14548  416  14550 0
-14546  14547 -14548  416 -14551 0

c  -2-1 --> break 
c    ( b^{26, 16}_2 ∧  b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨  b^{26, 16}_0 ∨  p_416 ∨ break
c  in DIMACS:
-14546 -14547  14548  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 16}_2 ∧ -b^{26, 16}_1 ∧ -b^{26, 16}_0 ∧ true) 
c  in CNF:
c    -b^{26, 16}_2 ∨  b^{26, 16}_1 ∨  b^{26, 16}_0 ∨ false 
c  in DIMACS:
-14546  14547  14548  0

c  3 does not represent an automaton state.
c    -(-b^{26, 16}_2 ∧  b^{26, 16}_1 ∧  b^{26, 16}_0 ∧ true) 
c  in CNF:
c     b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ false 
c  in DIMACS:
 14546 -14547 -14548  0
c  -3 does not represent an automaton state.
c    -( b^{26, 16}_2 ∧  b^{26, 16}_1 ∧  b^{26, 16}_0 ∧ true) 
c  in CNF:
c    -b^{26, 16}_2 ∨ -b^{26, 16}_1 ∨ -b^{26, 16}_0 ∨ false 
c  in DIMACS:
-14546 -14547 -14548  0

c i = 17
c  -2+1 --> -1
c    ( b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧  p_442) -> ( b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0)
c  in CNF:
c    -b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨  b^{26, 18}_2
c    -b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_1
c    -b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨  b^{26, 18}_0
c  in DIMACS:
-14549 -14550  14551 -442  14552 0
-14549 -14550  14551 -442 -14553 0
-14549 -14550  14551 -442  14554 0

c  -1+1 --> 0
c    ( b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0 ∧  p_442) -> (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧ -b^{26, 18}_0)
c  in CNF:
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_2
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_1
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_0
c  in DIMACS:
-14549  14550 -14551 -442 -14552 0
-14549  14550 -14551 -442 -14553 0
-14549  14550 -14551 -442 -14554 0

c  0+1 --> 1
c    (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧  p_442) -> (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0)
c  in CNF:
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_2
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_1
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨  b^{26, 18}_0
c  in DIMACS:
 14549  14550  14551 -442 -14552 0
 14549  14550  14551 -442 -14553 0
 14549  14550  14551 -442  14554 0

c  1+1 --> 2
c    (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0 ∧  p_442) -> (-b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0)
c  in CNF:
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_2
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨  b^{26, 18}_1
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ -p_442 ∨ -b^{26, 18}_0
c  in DIMACS:
 14549  14550 -14551 -442 -14552 0
 14549  14550 -14551 -442  14553 0
 14549  14550 -14551 -442 -14554 0

c  2+1 --> break 
c    (-b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧  p_442) -> break
c  in CNF:
c     b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 14549 -14550  14551 -442 1162 0


c  2-1 --> 1
c    (-b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧ -p_442) -> (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0)
c  in CNF:
c     b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_2
c     b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_1
c     b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨  b^{26, 18}_0
c  in DIMACS:
 14549 -14550  14551  442 -14552 0
 14549 -14550  14551  442 -14553 0
 14549 -14550  14551  442  14554 0

c  1-1 --> 0
c    (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0 ∧ -p_442) -> (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧ -b^{26, 18}_0)
c  in CNF:
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_2
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_1
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_0
c  in DIMACS:
 14549  14550 -14551  442 -14552 0
 14549  14550 -14551  442 -14553 0
 14549  14550 -14551  442 -14554 0

c  0-1 --> -1
c    (-b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧ -p_442) -> ( b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0)
c  in CNF:
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨  b^{26, 18}_2
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_1
c     b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨  b^{26, 18}_0
c  in DIMACS:
 14549  14550  14551  442  14552 0
 14549  14550  14551  442 -14553 0
 14549  14550  14551  442  14554 0

c  -1-1 --> -2
c    ( b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧  b^{26, 17}_0 ∧ -p_442) -> ( b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0)
c  in CNF:
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨  b^{26, 18}_2
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨  b^{26, 18}_1
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨  p_442 ∨ -b^{26, 18}_0
c  in DIMACS:
-14549  14550 -14551  442  14552 0
-14549  14550 -14551  442  14553 0
-14549  14550 -14551  442 -14554 0

c  -2-1 --> break 
c    ( b^{26, 17}_2 ∧  b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨  b^{26, 17}_0 ∨  p_442 ∨ break
c  in DIMACS:
-14549 -14550  14551  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 17}_2 ∧ -b^{26, 17}_1 ∧ -b^{26, 17}_0 ∧ true) 
c  in CNF:
c    -b^{26, 17}_2 ∨  b^{26, 17}_1 ∨  b^{26, 17}_0 ∨ false 
c  in DIMACS:
-14549  14550  14551  0

c  3 does not represent an automaton state.
c    -(-b^{26, 17}_2 ∧  b^{26, 17}_1 ∧  b^{26, 17}_0 ∧ true) 
c  in CNF:
c     b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ false 
c  in DIMACS:
 14549 -14550 -14551  0
c  -3 does not represent an automaton state.
c    -( b^{26, 17}_2 ∧  b^{26, 17}_1 ∧  b^{26, 17}_0 ∧ true) 
c  in CNF:
c    -b^{26, 17}_2 ∨ -b^{26, 17}_1 ∨ -b^{26, 17}_0 ∨ false 
c  in DIMACS:
-14549 -14550 -14551  0

c i = 18
c  -2+1 --> -1
c    ( b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧  p_468) -> ( b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0)
c  in CNF:
c    -b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨  b^{26, 19}_2
c    -b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_1
c    -b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨  b^{26, 19}_0
c  in DIMACS:
-14552 -14553  14554 -468  14555 0
-14552 -14553  14554 -468 -14556 0
-14552 -14553  14554 -468  14557 0

c  -1+1 --> 0
c    ( b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0 ∧  p_468) -> (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧ -b^{26, 19}_0)
c  in CNF:
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_2
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_1
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_0
c  in DIMACS:
-14552  14553 -14554 -468 -14555 0
-14552  14553 -14554 -468 -14556 0
-14552  14553 -14554 -468 -14557 0

c  0+1 --> 1
c    (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧  p_468) -> (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0)
c  in CNF:
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_2
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_1
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨  b^{26, 19}_0
c  in DIMACS:
 14552  14553  14554 -468 -14555 0
 14552  14553  14554 -468 -14556 0
 14552  14553  14554 -468  14557 0

c  1+1 --> 2
c    (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0 ∧  p_468) -> (-b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0)
c  in CNF:
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_2
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨  b^{26, 19}_1
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ -p_468 ∨ -b^{26, 19}_0
c  in DIMACS:
 14552  14553 -14554 -468 -14555 0
 14552  14553 -14554 -468  14556 0
 14552  14553 -14554 -468 -14557 0

c  2+1 --> break 
c    (-b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧  p_468) -> break
c  in CNF:
c     b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 14552 -14553  14554 -468 1162 0


c  2-1 --> 1
c    (-b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧ -p_468) -> (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0)
c  in CNF:
c     b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_2
c     b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_1
c     b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨  b^{26, 19}_0
c  in DIMACS:
 14552 -14553  14554  468 -14555 0
 14552 -14553  14554  468 -14556 0
 14552 -14553  14554  468  14557 0

c  1-1 --> 0
c    (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0 ∧ -p_468) -> (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧ -b^{26, 19}_0)
c  in CNF:
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_2
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_1
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_0
c  in DIMACS:
 14552  14553 -14554  468 -14555 0
 14552  14553 -14554  468 -14556 0
 14552  14553 -14554  468 -14557 0

c  0-1 --> -1
c    (-b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧ -p_468) -> ( b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0)
c  in CNF:
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨  b^{26, 19}_2
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_1
c     b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨  b^{26, 19}_0
c  in DIMACS:
 14552  14553  14554  468  14555 0
 14552  14553  14554  468 -14556 0
 14552  14553  14554  468  14557 0

c  -1-1 --> -2
c    ( b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧  b^{26, 18}_0 ∧ -p_468) -> ( b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0)
c  in CNF:
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨  b^{26, 19}_2
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨  b^{26, 19}_1
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨  p_468 ∨ -b^{26, 19}_0
c  in DIMACS:
-14552  14553 -14554  468  14555 0
-14552  14553 -14554  468  14556 0
-14552  14553 -14554  468 -14557 0

c  -2-1 --> break 
c    ( b^{26, 18}_2 ∧  b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨  b^{26, 18}_0 ∨  p_468 ∨ break
c  in DIMACS:
-14552 -14553  14554  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 18}_2 ∧ -b^{26, 18}_1 ∧ -b^{26, 18}_0 ∧ true) 
c  in CNF:
c    -b^{26, 18}_2 ∨  b^{26, 18}_1 ∨  b^{26, 18}_0 ∨ false 
c  in DIMACS:
-14552  14553  14554  0

c  3 does not represent an automaton state.
c    -(-b^{26, 18}_2 ∧  b^{26, 18}_1 ∧  b^{26, 18}_0 ∧ true) 
c  in CNF:
c     b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ false 
c  in DIMACS:
 14552 -14553 -14554  0
c  -3 does not represent an automaton state.
c    -( b^{26, 18}_2 ∧  b^{26, 18}_1 ∧  b^{26, 18}_0 ∧ true) 
c  in CNF:
c    -b^{26, 18}_2 ∨ -b^{26, 18}_1 ∨ -b^{26, 18}_0 ∨ false 
c  in DIMACS:
-14552 -14553 -14554  0

c i = 19
c  -2+1 --> -1
c    ( b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧  p_494) -> ( b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0)
c  in CNF:
c    -b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨  b^{26, 20}_2
c    -b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_1
c    -b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨  b^{26, 20}_0
c  in DIMACS:
-14555 -14556  14557 -494  14558 0
-14555 -14556  14557 -494 -14559 0
-14555 -14556  14557 -494  14560 0

c  -1+1 --> 0
c    ( b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0 ∧  p_494) -> (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧ -b^{26, 20}_0)
c  in CNF:
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_2
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_1
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_0
c  in DIMACS:
-14555  14556 -14557 -494 -14558 0
-14555  14556 -14557 -494 -14559 0
-14555  14556 -14557 -494 -14560 0

c  0+1 --> 1
c    (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧  p_494) -> (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0)
c  in CNF:
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_2
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_1
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨  b^{26, 20}_0
c  in DIMACS:
 14555  14556  14557 -494 -14558 0
 14555  14556  14557 -494 -14559 0
 14555  14556  14557 -494  14560 0

c  1+1 --> 2
c    (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0 ∧  p_494) -> (-b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0)
c  in CNF:
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_2
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨  b^{26, 20}_1
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ -p_494 ∨ -b^{26, 20}_0
c  in DIMACS:
 14555  14556 -14557 -494 -14558 0
 14555  14556 -14557 -494  14559 0
 14555  14556 -14557 -494 -14560 0

c  2+1 --> break 
c    (-b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧  p_494) -> break
c  in CNF:
c     b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 14555 -14556  14557 -494 1162 0


c  2-1 --> 1
c    (-b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧ -p_494) -> (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0)
c  in CNF:
c     b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_2
c     b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_1
c     b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨  b^{26, 20}_0
c  in DIMACS:
 14555 -14556  14557  494 -14558 0
 14555 -14556  14557  494 -14559 0
 14555 -14556  14557  494  14560 0

c  1-1 --> 0
c    (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0 ∧ -p_494) -> (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧ -b^{26, 20}_0)
c  in CNF:
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_2
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_1
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_0
c  in DIMACS:
 14555  14556 -14557  494 -14558 0
 14555  14556 -14557  494 -14559 0
 14555  14556 -14557  494 -14560 0

c  0-1 --> -1
c    (-b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧ -p_494) -> ( b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0)
c  in CNF:
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨  b^{26, 20}_2
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_1
c     b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨  b^{26, 20}_0
c  in DIMACS:
 14555  14556  14557  494  14558 0
 14555  14556  14557  494 -14559 0
 14555  14556  14557  494  14560 0

c  -1-1 --> -2
c    ( b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧  b^{26, 19}_0 ∧ -p_494) -> ( b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0)
c  in CNF:
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨  b^{26, 20}_2
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨  b^{26, 20}_1
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨  p_494 ∨ -b^{26, 20}_0
c  in DIMACS:
-14555  14556 -14557  494  14558 0
-14555  14556 -14557  494  14559 0
-14555  14556 -14557  494 -14560 0

c  -2-1 --> break 
c    ( b^{26, 19}_2 ∧  b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨  b^{26, 19}_0 ∨  p_494 ∨ break
c  in DIMACS:
-14555 -14556  14557  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 19}_2 ∧ -b^{26, 19}_1 ∧ -b^{26, 19}_0 ∧ true) 
c  in CNF:
c    -b^{26, 19}_2 ∨  b^{26, 19}_1 ∨  b^{26, 19}_0 ∨ false 
c  in DIMACS:
-14555  14556  14557  0

c  3 does not represent an automaton state.
c    -(-b^{26, 19}_2 ∧  b^{26, 19}_1 ∧  b^{26, 19}_0 ∧ true) 
c  in CNF:
c     b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ false 
c  in DIMACS:
 14555 -14556 -14557  0
c  -3 does not represent an automaton state.
c    -( b^{26, 19}_2 ∧  b^{26, 19}_1 ∧  b^{26, 19}_0 ∧ true) 
c  in CNF:
c    -b^{26, 19}_2 ∨ -b^{26, 19}_1 ∨ -b^{26, 19}_0 ∨ false 
c  in DIMACS:
-14555 -14556 -14557  0

c i = 20
c  -2+1 --> -1
c    ( b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧  p_520) -> ( b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0)
c  in CNF:
c    -b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨  b^{26, 21}_2
c    -b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_1
c    -b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨  b^{26, 21}_0
c  in DIMACS:
-14558 -14559  14560 -520  14561 0
-14558 -14559  14560 -520 -14562 0
-14558 -14559  14560 -520  14563 0

c  -1+1 --> 0
c    ( b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0 ∧  p_520) -> (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧ -b^{26, 21}_0)
c  in CNF:
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_2
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_1
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_0
c  in DIMACS:
-14558  14559 -14560 -520 -14561 0
-14558  14559 -14560 -520 -14562 0
-14558  14559 -14560 -520 -14563 0

c  0+1 --> 1
c    (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧  p_520) -> (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0)
c  in CNF:
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_2
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_1
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨  b^{26, 21}_0
c  in DIMACS:
 14558  14559  14560 -520 -14561 0
 14558  14559  14560 -520 -14562 0
 14558  14559  14560 -520  14563 0

c  1+1 --> 2
c    (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0 ∧  p_520) -> (-b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0)
c  in CNF:
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_2
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨  b^{26, 21}_1
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ -p_520 ∨ -b^{26, 21}_0
c  in DIMACS:
 14558  14559 -14560 -520 -14561 0
 14558  14559 -14560 -520  14562 0
 14558  14559 -14560 -520 -14563 0

c  2+1 --> break 
c    (-b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧  p_520) -> break
c  in CNF:
c     b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 14558 -14559  14560 -520 1162 0


c  2-1 --> 1
c    (-b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧ -p_520) -> (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0)
c  in CNF:
c     b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_2
c     b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_1
c     b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨  b^{26, 21}_0
c  in DIMACS:
 14558 -14559  14560  520 -14561 0
 14558 -14559  14560  520 -14562 0
 14558 -14559  14560  520  14563 0

c  1-1 --> 0
c    (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0 ∧ -p_520) -> (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧ -b^{26, 21}_0)
c  in CNF:
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_2
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_1
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_0
c  in DIMACS:
 14558  14559 -14560  520 -14561 0
 14558  14559 -14560  520 -14562 0
 14558  14559 -14560  520 -14563 0

c  0-1 --> -1
c    (-b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧ -p_520) -> ( b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0)
c  in CNF:
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨  b^{26, 21}_2
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_1
c     b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨  b^{26, 21}_0
c  in DIMACS:
 14558  14559  14560  520  14561 0
 14558  14559  14560  520 -14562 0
 14558  14559  14560  520  14563 0

c  -1-1 --> -2
c    ( b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧  b^{26, 20}_0 ∧ -p_520) -> ( b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0)
c  in CNF:
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨  b^{26, 21}_2
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨  b^{26, 21}_1
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨  p_520 ∨ -b^{26, 21}_0
c  in DIMACS:
-14558  14559 -14560  520  14561 0
-14558  14559 -14560  520  14562 0
-14558  14559 -14560  520 -14563 0

c  -2-1 --> break 
c    ( b^{26, 20}_2 ∧  b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨  b^{26, 20}_0 ∨  p_520 ∨ break
c  in DIMACS:
-14558 -14559  14560  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 20}_2 ∧ -b^{26, 20}_1 ∧ -b^{26, 20}_0 ∧ true) 
c  in CNF:
c    -b^{26, 20}_2 ∨  b^{26, 20}_1 ∨  b^{26, 20}_0 ∨ false 
c  in DIMACS:
-14558  14559  14560  0

c  3 does not represent an automaton state.
c    -(-b^{26, 20}_2 ∧  b^{26, 20}_1 ∧  b^{26, 20}_0 ∧ true) 
c  in CNF:
c     b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ false 
c  in DIMACS:
 14558 -14559 -14560  0
c  -3 does not represent an automaton state.
c    -( b^{26, 20}_2 ∧  b^{26, 20}_1 ∧  b^{26, 20}_0 ∧ true) 
c  in CNF:
c    -b^{26, 20}_2 ∨ -b^{26, 20}_1 ∨ -b^{26, 20}_0 ∨ false 
c  in DIMACS:
-14558 -14559 -14560  0

c i = 21
c  -2+1 --> -1
c    ( b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧  p_546) -> ( b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0)
c  in CNF:
c    -b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨  b^{26, 22}_2
c    -b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_1
c    -b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨  b^{26, 22}_0
c  in DIMACS:
-14561 -14562  14563 -546  14564 0
-14561 -14562  14563 -546 -14565 0
-14561 -14562  14563 -546  14566 0

c  -1+1 --> 0
c    ( b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0 ∧  p_546) -> (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧ -b^{26, 22}_0)
c  in CNF:
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_2
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_1
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_0
c  in DIMACS:
-14561  14562 -14563 -546 -14564 0
-14561  14562 -14563 -546 -14565 0
-14561  14562 -14563 -546 -14566 0

c  0+1 --> 1
c    (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧  p_546) -> (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0)
c  in CNF:
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_2
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_1
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨  b^{26, 22}_0
c  in DIMACS:
 14561  14562  14563 -546 -14564 0
 14561  14562  14563 -546 -14565 0
 14561  14562  14563 -546  14566 0

c  1+1 --> 2
c    (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0 ∧  p_546) -> (-b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0)
c  in CNF:
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_2
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨  b^{26, 22}_1
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ -p_546 ∨ -b^{26, 22}_0
c  in DIMACS:
 14561  14562 -14563 -546 -14564 0
 14561  14562 -14563 -546  14565 0
 14561  14562 -14563 -546 -14566 0

c  2+1 --> break 
c    (-b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧  p_546) -> break
c  in CNF:
c     b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 14561 -14562  14563 -546 1162 0


c  2-1 --> 1
c    (-b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧ -p_546) -> (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0)
c  in CNF:
c     b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_2
c     b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_1
c     b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨  b^{26, 22}_0
c  in DIMACS:
 14561 -14562  14563  546 -14564 0
 14561 -14562  14563  546 -14565 0
 14561 -14562  14563  546  14566 0

c  1-1 --> 0
c    (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0 ∧ -p_546) -> (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧ -b^{26, 22}_0)
c  in CNF:
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_2
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_1
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_0
c  in DIMACS:
 14561  14562 -14563  546 -14564 0
 14561  14562 -14563  546 -14565 0
 14561  14562 -14563  546 -14566 0

c  0-1 --> -1
c    (-b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧ -p_546) -> ( b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0)
c  in CNF:
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨  b^{26, 22}_2
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_1
c     b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨  b^{26, 22}_0
c  in DIMACS:
 14561  14562  14563  546  14564 0
 14561  14562  14563  546 -14565 0
 14561  14562  14563  546  14566 0

c  -1-1 --> -2
c    ( b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧  b^{26, 21}_0 ∧ -p_546) -> ( b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0)
c  in CNF:
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨  b^{26, 22}_2
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨  b^{26, 22}_1
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨  p_546 ∨ -b^{26, 22}_0
c  in DIMACS:
-14561  14562 -14563  546  14564 0
-14561  14562 -14563  546  14565 0
-14561  14562 -14563  546 -14566 0

c  -2-1 --> break 
c    ( b^{26, 21}_2 ∧  b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨  b^{26, 21}_0 ∨  p_546 ∨ break
c  in DIMACS:
-14561 -14562  14563  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 21}_2 ∧ -b^{26, 21}_1 ∧ -b^{26, 21}_0 ∧ true) 
c  in CNF:
c    -b^{26, 21}_2 ∨  b^{26, 21}_1 ∨  b^{26, 21}_0 ∨ false 
c  in DIMACS:
-14561  14562  14563  0

c  3 does not represent an automaton state.
c    -(-b^{26, 21}_2 ∧  b^{26, 21}_1 ∧  b^{26, 21}_0 ∧ true) 
c  in CNF:
c     b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ false 
c  in DIMACS:
 14561 -14562 -14563  0
c  -3 does not represent an automaton state.
c    -( b^{26, 21}_2 ∧  b^{26, 21}_1 ∧  b^{26, 21}_0 ∧ true) 
c  in CNF:
c    -b^{26, 21}_2 ∨ -b^{26, 21}_1 ∨ -b^{26, 21}_0 ∨ false 
c  in DIMACS:
-14561 -14562 -14563  0

c i = 22
c  -2+1 --> -1
c    ( b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧  p_572) -> ( b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0)
c  in CNF:
c    -b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨  b^{26, 23}_2
c    -b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_1
c    -b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨  b^{26, 23}_0
c  in DIMACS:
-14564 -14565  14566 -572  14567 0
-14564 -14565  14566 -572 -14568 0
-14564 -14565  14566 -572  14569 0

c  -1+1 --> 0
c    ( b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0 ∧  p_572) -> (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧ -b^{26, 23}_0)
c  in CNF:
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_2
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_1
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_0
c  in DIMACS:
-14564  14565 -14566 -572 -14567 0
-14564  14565 -14566 -572 -14568 0
-14564  14565 -14566 -572 -14569 0

c  0+1 --> 1
c    (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧  p_572) -> (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0)
c  in CNF:
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_2
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_1
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨  b^{26, 23}_0
c  in DIMACS:
 14564  14565  14566 -572 -14567 0
 14564  14565  14566 -572 -14568 0
 14564  14565  14566 -572  14569 0

c  1+1 --> 2
c    (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0 ∧  p_572) -> (-b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0)
c  in CNF:
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_2
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨  b^{26, 23}_1
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ -p_572 ∨ -b^{26, 23}_0
c  in DIMACS:
 14564  14565 -14566 -572 -14567 0
 14564  14565 -14566 -572  14568 0
 14564  14565 -14566 -572 -14569 0

c  2+1 --> break 
c    (-b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧  p_572) -> break
c  in CNF:
c     b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 14564 -14565  14566 -572 1162 0


c  2-1 --> 1
c    (-b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧ -p_572) -> (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0)
c  in CNF:
c     b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_2
c     b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_1
c     b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨  b^{26, 23}_0
c  in DIMACS:
 14564 -14565  14566  572 -14567 0
 14564 -14565  14566  572 -14568 0
 14564 -14565  14566  572  14569 0

c  1-1 --> 0
c    (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0 ∧ -p_572) -> (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧ -b^{26, 23}_0)
c  in CNF:
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_2
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_1
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_0
c  in DIMACS:
 14564  14565 -14566  572 -14567 0
 14564  14565 -14566  572 -14568 0
 14564  14565 -14566  572 -14569 0

c  0-1 --> -1
c    (-b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧ -p_572) -> ( b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0)
c  in CNF:
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨  b^{26, 23}_2
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_1
c     b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨  b^{26, 23}_0
c  in DIMACS:
 14564  14565  14566  572  14567 0
 14564  14565  14566  572 -14568 0
 14564  14565  14566  572  14569 0

c  -1-1 --> -2
c    ( b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧  b^{26, 22}_0 ∧ -p_572) -> ( b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0)
c  in CNF:
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨  b^{26, 23}_2
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨  b^{26, 23}_1
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨  p_572 ∨ -b^{26, 23}_0
c  in DIMACS:
-14564  14565 -14566  572  14567 0
-14564  14565 -14566  572  14568 0
-14564  14565 -14566  572 -14569 0

c  -2-1 --> break 
c    ( b^{26, 22}_2 ∧  b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨  b^{26, 22}_0 ∨  p_572 ∨ break
c  in DIMACS:
-14564 -14565  14566  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 22}_2 ∧ -b^{26, 22}_1 ∧ -b^{26, 22}_0 ∧ true) 
c  in CNF:
c    -b^{26, 22}_2 ∨  b^{26, 22}_1 ∨  b^{26, 22}_0 ∨ false 
c  in DIMACS:
-14564  14565  14566  0

c  3 does not represent an automaton state.
c    -(-b^{26, 22}_2 ∧  b^{26, 22}_1 ∧  b^{26, 22}_0 ∧ true) 
c  in CNF:
c     b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ false 
c  in DIMACS:
 14564 -14565 -14566  0
c  -3 does not represent an automaton state.
c    -( b^{26, 22}_2 ∧  b^{26, 22}_1 ∧  b^{26, 22}_0 ∧ true) 
c  in CNF:
c    -b^{26, 22}_2 ∨ -b^{26, 22}_1 ∨ -b^{26, 22}_0 ∨ false 
c  in DIMACS:
-14564 -14565 -14566  0

c i = 23
c  -2+1 --> -1
c    ( b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧  p_598) -> ( b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0)
c  in CNF:
c    -b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨  b^{26, 24}_2
c    -b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_1
c    -b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨  b^{26, 24}_0
c  in DIMACS:
-14567 -14568  14569 -598  14570 0
-14567 -14568  14569 -598 -14571 0
-14567 -14568  14569 -598  14572 0

c  -1+1 --> 0
c    ( b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0 ∧  p_598) -> (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧ -b^{26, 24}_0)
c  in CNF:
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_2
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_1
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_0
c  in DIMACS:
-14567  14568 -14569 -598 -14570 0
-14567  14568 -14569 -598 -14571 0
-14567  14568 -14569 -598 -14572 0

c  0+1 --> 1
c    (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧  p_598) -> (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0)
c  in CNF:
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_2
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_1
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨  b^{26, 24}_0
c  in DIMACS:
 14567  14568  14569 -598 -14570 0
 14567  14568  14569 -598 -14571 0
 14567  14568  14569 -598  14572 0

c  1+1 --> 2
c    (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0 ∧  p_598) -> (-b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0)
c  in CNF:
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_2
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨  b^{26, 24}_1
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ -p_598 ∨ -b^{26, 24}_0
c  in DIMACS:
 14567  14568 -14569 -598 -14570 0
 14567  14568 -14569 -598  14571 0
 14567  14568 -14569 -598 -14572 0

c  2+1 --> break 
c    (-b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧  p_598) -> break
c  in CNF:
c     b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 14567 -14568  14569 -598 1162 0


c  2-1 --> 1
c    (-b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧ -p_598) -> (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0)
c  in CNF:
c     b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_2
c     b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_1
c     b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨  b^{26, 24}_0
c  in DIMACS:
 14567 -14568  14569  598 -14570 0
 14567 -14568  14569  598 -14571 0
 14567 -14568  14569  598  14572 0

c  1-1 --> 0
c    (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0 ∧ -p_598) -> (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧ -b^{26, 24}_0)
c  in CNF:
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_2
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_1
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_0
c  in DIMACS:
 14567  14568 -14569  598 -14570 0
 14567  14568 -14569  598 -14571 0
 14567  14568 -14569  598 -14572 0

c  0-1 --> -1
c    (-b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧ -p_598) -> ( b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0)
c  in CNF:
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨  b^{26, 24}_2
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_1
c     b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨  b^{26, 24}_0
c  in DIMACS:
 14567  14568  14569  598  14570 0
 14567  14568  14569  598 -14571 0
 14567  14568  14569  598  14572 0

c  -1-1 --> -2
c    ( b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧  b^{26, 23}_0 ∧ -p_598) -> ( b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0)
c  in CNF:
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨  b^{26, 24}_2
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨  b^{26, 24}_1
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨  p_598 ∨ -b^{26, 24}_0
c  in DIMACS:
-14567  14568 -14569  598  14570 0
-14567  14568 -14569  598  14571 0
-14567  14568 -14569  598 -14572 0

c  -2-1 --> break 
c    ( b^{26, 23}_2 ∧  b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨  b^{26, 23}_0 ∨  p_598 ∨ break
c  in DIMACS:
-14567 -14568  14569  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 23}_2 ∧ -b^{26, 23}_1 ∧ -b^{26, 23}_0 ∧ true) 
c  in CNF:
c    -b^{26, 23}_2 ∨  b^{26, 23}_1 ∨  b^{26, 23}_0 ∨ false 
c  in DIMACS:
-14567  14568  14569  0

c  3 does not represent an automaton state.
c    -(-b^{26, 23}_2 ∧  b^{26, 23}_1 ∧  b^{26, 23}_0 ∧ true) 
c  in CNF:
c     b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ false 
c  in DIMACS:
 14567 -14568 -14569  0
c  -3 does not represent an automaton state.
c    -( b^{26, 23}_2 ∧  b^{26, 23}_1 ∧  b^{26, 23}_0 ∧ true) 
c  in CNF:
c    -b^{26, 23}_2 ∨ -b^{26, 23}_1 ∨ -b^{26, 23}_0 ∨ false 
c  in DIMACS:
-14567 -14568 -14569  0

c i = 24
c  -2+1 --> -1
c    ( b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧  p_624) -> ( b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0)
c  in CNF:
c    -b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨  b^{26, 25}_2
c    -b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_1
c    -b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨  b^{26, 25}_0
c  in DIMACS:
-14570 -14571  14572 -624  14573 0
-14570 -14571  14572 -624 -14574 0
-14570 -14571  14572 -624  14575 0

c  -1+1 --> 0
c    ( b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0 ∧  p_624) -> (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧ -b^{26, 25}_0)
c  in CNF:
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_2
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_1
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_0
c  in DIMACS:
-14570  14571 -14572 -624 -14573 0
-14570  14571 -14572 -624 -14574 0
-14570  14571 -14572 -624 -14575 0

c  0+1 --> 1
c    (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧  p_624) -> (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0)
c  in CNF:
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_2
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_1
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨  b^{26, 25}_0
c  in DIMACS:
 14570  14571  14572 -624 -14573 0
 14570  14571  14572 -624 -14574 0
 14570  14571  14572 -624  14575 0

c  1+1 --> 2
c    (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0 ∧  p_624) -> (-b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0)
c  in CNF:
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_2
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨  b^{26, 25}_1
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ -p_624 ∨ -b^{26, 25}_0
c  in DIMACS:
 14570  14571 -14572 -624 -14573 0
 14570  14571 -14572 -624  14574 0
 14570  14571 -14572 -624 -14575 0

c  2+1 --> break 
c    (-b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧  p_624) -> break
c  in CNF:
c     b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 14570 -14571  14572 -624 1162 0


c  2-1 --> 1
c    (-b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧ -p_624) -> (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0)
c  in CNF:
c     b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_2
c     b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_1
c     b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨  b^{26, 25}_0
c  in DIMACS:
 14570 -14571  14572  624 -14573 0
 14570 -14571  14572  624 -14574 0
 14570 -14571  14572  624  14575 0

c  1-1 --> 0
c    (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0 ∧ -p_624) -> (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧ -b^{26, 25}_0)
c  in CNF:
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_2
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_1
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_0
c  in DIMACS:
 14570  14571 -14572  624 -14573 0
 14570  14571 -14572  624 -14574 0
 14570  14571 -14572  624 -14575 0

c  0-1 --> -1
c    (-b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧ -p_624) -> ( b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0)
c  in CNF:
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨  b^{26, 25}_2
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_1
c     b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨  b^{26, 25}_0
c  in DIMACS:
 14570  14571  14572  624  14573 0
 14570  14571  14572  624 -14574 0
 14570  14571  14572  624  14575 0

c  -1-1 --> -2
c    ( b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧  b^{26, 24}_0 ∧ -p_624) -> ( b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0)
c  in CNF:
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨  b^{26, 25}_2
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨  b^{26, 25}_1
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨  p_624 ∨ -b^{26, 25}_0
c  in DIMACS:
-14570  14571 -14572  624  14573 0
-14570  14571 -14572  624  14574 0
-14570  14571 -14572  624 -14575 0

c  -2-1 --> break 
c    ( b^{26, 24}_2 ∧  b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨  b^{26, 24}_0 ∨  p_624 ∨ break
c  in DIMACS:
-14570 -14571  14572  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 24}_2 ∧ -b^{26, 24}_1 ∧ -b^{26, 24}_0 ∧ true) 
c  in CNF:
c    -b^{26, 24}_2 ∨  b^{26, 24}_1 ∨  b^{26, 24}_0 ∨ false 
c  in DIMACS:
-14570  14571  14572  0

c  3 does not represent an automaton state.
c    -(-b^{26, 24}_2 ∧  b^{26, 24}_1 ∧  b^{26, 24}_0 ∧ true) 
c  in CNF:
c     b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ false 
c  in DIMACS:
 14570 -14571 -14572  0
c  -3 does not represent an automaton state.
c    -( b^{26, 24}_2 ∧  b^{26, 24}_1 ∧  b^{26, 24}_0 ∧ true) 
c  in CNF:
c    -b^{26, 24}_2 ∨ -b^{26, 24}_1 ∨ -b^{26, 24}_0 ∨ false 
c  in DIMACS:
-14570 -14571 -14572  0

c i = 25
c  -2+1 --> -1
c    ( b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧  p_650) -> ( b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0)
c  in CNF:
c    -b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨  b^{26, 26}_2
c    -b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_1
c    -b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨  b^{26, 26}_0
c  in DIMACS:
-14573 -14574  14575 -650  14576 0
-14573 -14574  14575 -650 -14577 0
-14573 -14574  14575 -650  14578 0

c  -1+1 --> 0
c    ( b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0 ∧  p_650) -> (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧ -b^{26, 26}_0)
c  in CNF:
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_2
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_1
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_0
c  in DIMACS:
-14573  14574 -14575 -650 -14576 0
-14573  14574 -14575 -650 -14577 0
-14573  14574 -14575 -650 -14578 0

c  0+1 --> 1
c    (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧  p_650) -> (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0)
c  in CNF:
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_2
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_1
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨  b^{26, 26}_0
c  in DIMACS:
 14573  14574  14575 -650 -14576 0
 14573  14574  14575 -650 -14577 0
 14573  14574  14575 -650  14578 0

c  1+1 --> 2
c    (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0 ∧  p_650) -> (-b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0)
c  in CNF:
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_2
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨  b^{26, 26}_1
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ -p_650 ∨ -b^{26, 26}_0
c  in DIMACS:
 14573  14574 -14575 -650 -14576 0
 14573  14574 -14575 -650  14577 0
 14573  14574 -14575 -650 -14578 0

c  2+1 --> break 
c    (-b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧  p_650) -> break
c  in CNF:
c     b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 14573 -14574  14575 -650 1162 0


c  2-1 --> 1
c    (-b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧ -p_650) -> (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0)
c  in CNF:
c     b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_2
c     b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_1
c     b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨  b^{26, 26}_0
c  in DIMACS:
 14573 -14574  14575  650 -14576 0
 14573 -14574  14575  650 -14577 0
 14573 -14574  14575  650  14578 0

c  1-1 --> 0
c    (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0 ∧ -p_650) -> (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧ -b^{26, 26}_0)
c  in CNF:
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_2
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_1
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_0
c  in DIMACS:
 14573  14574 -14575  650 -14576 0
 14573  14574 -14575  650 -14577 0
 14573  14574 -14575  650 -14578 0

c  0-1 --> -1
c    (-b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧ -p_650) -> ( b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0)
c  in CNF:
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨  b^{26, 26}_2
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_1
c     b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨  b^{26, 26}_0
c  in DIMACS:
 14573  14574  14575  650  14576 0
 14573  14574  14575  650 -14577 0
 14573  14574  14575  650  14578 0

c  -1-1 --> -2
c    ( b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧  b^{26, 25}_0 ∧ -p_650) -> ( b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0)
c  in CNF:
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨  b^{26, 26}_2
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨  b^{26, 26}_1
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨  p_650 ∨ -b^{26, 26}_0
c  in DIMACS:
-14573  14574 -14575  650  14576 0
-14573  14574 -14575  650  14577 0
-14573  14574 -14575  650 -14578 0

c  -2-1 --> break 
c    ( b^{26, 25}_2 ∧  b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨  b^{26, 25}_0 ∨  p_650 ∨ break
c  in DIMACS:
-14573 -14574  14575  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 25}_2 ∧ -b^{26, 25}_1 ∧ -b^{26, 25}_0 ∧ true) 
c  in CNF:
c    -b^{26, 25}_2 ∨  b^{26, 25}_1 ∨  b^{26, 25}_0 ∨ false 
c  in DIMACS:
-14573  14574  14575  0

c  3 does not represent an automaton state.
c    -(-b^{26, 25}_2 ∧  b^{26, 25}_1 ∧  b^{26, 25}_0 ∧ true) 
c  in CNF:
c     b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ false 
c  in DIMACS:
 14573 -14574 -14575  0
c  -3 does not represent an automaton state.
c    -( b^{26, 25}_2 ∧  b^{26, 25}_1 ∧  b^{26, 25}_0 ∧ true) 
c  in CNF:
c    -b^{26, 25}_2 ∨ -b^{26, 25}_1 ∨ -b^{26, 25}_0 ∨ false 
c  in DIMACS:
-14573 -14574 -14575  0

c i = 26
c  -2+1 --> -1
c    ( b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧  p_676) -> ( b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0)
c  in CNF:
c    -b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨  b^{26, 27}_2
c    -b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_1
c    -b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨  b^{26, 27}_0
c  in DIMACS:
-14576 -14577  14578 -676  14579 0
-14576 -14577  14578 -676 -14580 0
-14576 -14577  14578 -676  14581 0

c  -1+1 --> 0
c    ( b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0 ∧  p_676) -> (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧ -b^{26, 27}_0)
c  in CNF:
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_2
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_1
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_0
c  in DIMACS:
-14576  14577 -14578 -676 -14579 0
-14576  14577 -14578 -676 -14580 0
-14576  14577 -14578 -676 -14581 0

c  0+1 --> 1
c    (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧  p_676) -> (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0)
c  in CNF:
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_2
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_1
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨  b^{26, 27}_0
c  in DIMACS:
 14576  14577  14578 -676 -14579 0
 14576  14577  14578 -676 -14580 0
 14576  14577  14578 -676  14581 0

c  1+1 --> 2
c    (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0 ∧  p_676) -> (-b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0)
c  in CNF:
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_2
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨  b^{26, 27}_1
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ -p_676 ∨ -b^{26, 27}_0
c  in DIMACS:
 14576  14577 -14578 -676 -14579 0
 14576  14577 -14578 -676  14580 0
 14576  14577 -14578 -676 -14581 0

c  2+1 --> break 
c    (-b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧  p_676) -> break
c  in CNF:
c     b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 14576 -14577  14578 -676 1162 0


c  2-1 --> 1
c    (-b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧ -p_676) -> (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0)
c  in CNF:
c     b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_2
c     b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_1
c     b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨  b^{26, 27}_0
c  in DIMACS:
 14576 -14577  14578  676 -14579 0
 14576 -14577  14578  676 -14580 0
 14576 -14577  14578  676  14581 0

c  1-1 --> 0
c    (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0 ∧ -p_676) -> (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧ -b^{26, 27}_0)
c  in CNF:
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_2
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_1
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_0
c  in DIMACS:
 14576  14577 -14578  676 -14579 0
 14576  14577 -14578  676 -14580 0
 14576  14577 -14578  676 -14581 0

c  0-1 --> -1
c    (-b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧ -p_676) -> ( b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0)
c  in CNF:
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨  b^{26, 27}_2
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_1
c     b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨  b^{26, 27}_0
c  in DIMACS:
 14576  14577  14578  676  14579 0
 14576  14577  14578  676 -14580 0
 14576  14577  14578  676  14581 0

c  -1-1 --> -2
c    ( b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧  b^{26, 26}_0 ∧ -p_676) -> ( b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0)
c  in CNF:
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨  b^{26, 27}_2
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨  b^{26, 27}_1
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨  p_676 ∨ -b^{26, 27}_0
c  in DIMACS:
-14576  14577 -14578  676  14579 0
-14576  14577 -14578  676  14580 0
-14576  14577 -14578  676 -14581 0

c  -2-1 --> break 
c    ( b^{26, 26}_2 ∧  b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨  b^{26, 26}_0 ∨  p_676 ∨ break
c  in DIMACS:
-14576 -14577  14578  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 26}_2 ∧ -b^{26, 26}_1 ∧ -b^{26, 26}_0 ∧ true) 
c  in CNF:
c    -b^{26, 26}_2 ∨  b^{26, 26}_1 ∨  b^{26, 26}_0 ∨ false 
c  in DIMACS:
-14576  14577  14578  0

c  3 does not represent an automaton state.
c    -(-b^{26, 26}_2 ∧  b^{26, 26}_1 ∧  b^{26, 26}_0 ∧ true) 
c  in CNF:
c     b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ false 
c  in DIMACS:
 14576 -14577 -14578  0
c  -3 does not represent an automaton state.
c    -( b^{26, 26}_2 ∧  b^{26, 26}_1 ∧  b^{26, 26}_0 ∧ true) 
c  in CNF:
c    -b^{26, 26}_2 ∨ -b^{26, 26}_1 ∨ -b^{26, 26}_0 ∨ false 
c  in DIMACS:
-14576 -14577 -14578  0

c i = 27
c  -2+1 --> -1
c    ( b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧  p_702) -> ( b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0)
c  in CNF:
c    -b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨  b^{26, 28}_2
c    -b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_1
c    -b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨  b^{26, 28}_0
c  in DIMACS:
-14579 -14580  14581 -702  14582 0
-14579 -14580  14581 -702 -14583 0
-14579 -14580  14581 -702  14584 0

c  -1+1 --> 0
c    ( b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0 ∧  p_702) -> (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧ -b^{26, 28}_0)
c  in CNF:
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_2
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_1
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_0
c  in DIMACS:
-14579  14580 -14581 -702 -14582 0
-14579  14580 -14581 -702 -14583 0
-14579  14580 -14581 -702 -14584 0

c  0+1 --> 1
c    (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧  p_702) -> (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0)
c  in CNF:
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_2
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_1
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨  b^{26, 28}_0
c  in DIMACS:
 14579  14580  14581 -702 -14582 0
 14579  14580  14581 -702 -14583 0
 14579  14580  14581 -702  14584 0

c  1+1 --> 2
c    (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0 ∧  p_702) -> (-b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0)
c  in CNF:
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_2
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨  b^{26, 28}_1
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ -p_702 ∨ -b^{26, 28}_0
c  in DIMACS:
 14579  14580 -14581 -702 -14582 0
 14579  14580 -14581 -702  14583 0
 14579  14580 -14581 -702 -14584 0

c  2+1 --> break 
c    (-b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧  p_702) -> break
c  in CNF:
c     b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 14579 -14580  14581 -702 1162 0


c  2-1 --> 1
c    (-b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧ -p_702) -> (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0)
c  in CNF:
c     b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_2
c     b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_1
c     b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨  b^{26, 28}_0
c  in DIMACS:
 14579 -14580  14581  702 -14582 0
 14579 -14580  14581  702 -14583 0
 14579 -14580  14581  702  14584 0

c  1-1 --> 0
c    (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0 ∧ -p_702) -> (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧ -b^{26, 28}_0)
c  in CNF:
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_2
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_1
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_0
c  in DIMACS:
 14579  14580 -14581  702 -14582 0
 14579  14580 -14581  702 -14583 0
 14579  14580 -14581  702 -14584 0

c  0-1 --> -1
c    (-b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧ -p_702) -> ( b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0)
c  in CNF:
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨  b^{26, 28}_2
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_1
c     b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨  b^{26, 28}_0
c  in DIMACS:
 14579  14580  14581  702  14582 0
 14579  14580  14581  702 -14583 0
 14579  14580  14581  702  14584 0

c  -1-1 --> -2
c    ( b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧  b^{26, 27}_0 ∧ -p_702) -> ( b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0)
c  in CNF:
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨  b^{26, 28}_2
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨  b^{26, 28}_1
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨  p_702 ∨ -b^{26, 28}_0
c  in DIMACS:
-14579  14580 -14581  702  14582 0
-14579  14580 -14581  702  14583 0
-14579  14580 -14581  702 -14584 0

c  -2-1 --> break 
c    ( b^{26, 27}_2 ∧  b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨  b^{26, 27}_0 ∨  p_702 ∨ break
c  in DIMACS:
-14579 -14580  14581  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 27}_2 ∧ -b^{26, 27}_1 ∧ -b^{26, 27}_0 ∧ true) 
c  in CNF:
c    -b^{26, 27}_2 ∨  b^{26, 27}_1 ∨  b^{26, 27}_0 ∨ false 
c  in DIMACS:
-14579  14580  14581  0

c  3 does not represent an automaton state.
c    -(-b^{26, 27}_2 ∧  b^{26, 27}_1 ∧  b^{26, 27}_0 ∧ true) 
c  in CNF:
c     b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ false 
c  in DIMACS:
 14579 -14580 -14581  0
c  -3 does not represent an automaton state.
c    -( b^{26, 27}_2 ∧  b^{26, 27}_1 ∧  b^{26, 27}_0 ∧ true) 
c  in CNF:
c    -b^{26, 27}_2 ∨ -b^{26, 27}_1 ∨ -b^{26, 27}_0 ∨ false 
c  in DIMACS:
-14579 -14580 -14581  0

c i = 28
c  -2+1 --> -1
c    ( b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧  p_728) -> ( b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0)
c  in CNF:
c    -b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨  b^{26, 29}_2
c    -b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_1
c    -b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨  b^{26, 29}_0
c  in DIMACS:
-14582 -14583  14584 -728  14585 0
-14582 -14583  14584 -728 -14586 0
-14582 -14583  14584 -728  14587 0

c  -1+1 --> 0
c    ( b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0 ∧  p_728) -> (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧ -b^{26, 29}_0)
c  in CNF:
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_2
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_1
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_0
c  in DIMACS:
-14582  14583 -14584 -728 -14585 0
-14582  14583 -14584 -728 -14586 0
-14582  14583 -14584 -728 -14587 0

c  0+1 --> 1
c    (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧  p_728) -> (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0)
c  in CNF:
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_2
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_1
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨  b^{26, 29}_0
c  in DIMACS:
 14582  14583  14584 -728 -14585 0
 14582  14583  14584 -728 -14586 0
 14582  14583  14584 -728  14587 0

c  1+1 --> 2
c    (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0 ∧  p_728) -> (-b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0)
c  in CNF:
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_2
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨  b^{26, 29}_1
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ -p_728 ∨ -b^{26, 29}_0
c  in DIMACS:
 14582  14583 -14584 -728 -14585 0
 14582  14583 -14584 -728  14586 0
 14582  14583 -14584 -728 -14587 0

c  2+1 --> break 
c    (-b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧  p_728) -> break
c  in CNF:
c     b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 14582 -14583  14584 -728 1162 0


c  2-1 --> 1
c    (-b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧ -p_728) -> (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0)
c  in CNF:
c     b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_2
c     b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_1
c     b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨  b^{26, 29}_0
c  in DIMACS:
 14582 -14583  14584  728 -14585 0
 14582 -14583  14584  728 -14586 0
 14582 -14583  14584  728  14587 0

c  1-1 --> 0
c    (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0 ∧ -p_728) -> (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧ -b^{26, 29}_0)
c  in CNF:
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_2
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_1
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_0
c  in DIMACS:
 14582  14583 -14584  728 -14585 0
 14582  14583 -14584  728 -14586 0
 14582  14583 -14584  728 -14587 0

c  0-1 --> -1
c    (-b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧ -p_728) -> ( b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0)
c  in CNF:
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨  b^{26, 29}_2
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_1
c     b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨  b^{26, 29}_0
c  in DIMACS:
 14582  14583  14584  728  14585 0
 14582  14583  14584  728 -14586 0
 14582  14583  14584  728  14587 0

c  -1-1 --> -2
c    ( b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧  b^{26, 28}_0 ∧ -p_728) -> ( b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0)
c  in CNF:
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨  b^{26, 29}_2
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨  b^{26, 29}_1
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨  p_728 ∨ -b^{26, 29}_0
c  in DIMACS:
-14582  14583 -14584  728  14585 0
-14582  14583 -14584  728  14586 0
-14582  14583 -14584  728 -14587 0

c  -2-1 --> break 
c    ( b^{26, 28}_2 ∧  b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨  b^{26, 28}_0 ∨  p_728 ∨ break
c  in DIMACS:
-14582 -14583  14584  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 28}_2 ∧ -b^{26, 28}_1 ∧ -b^{26, 28}_0 ∧ true) 
c  in CNF:
c    -b^{26, 28}_2 ∨  b^{26, 28}_1 ∨  b^{26, 28}_0 ∨ false 
c  in DIMACS:
-14582  14583  14584  0

c  3 does not represent an automaton state.
c    -(-b^{26, 28}_2 ∧  b^{26, 28}_1 ∧  b^{26, 28}_0 ∧ true) 
c  in CNF:
c     b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ false 
c  in DIMACS:
 14582 -14583 -14584  0
c  -3 does not represent an automaton state.
c    -( b^{26, 28}_2 ∧  b^{26, 28}_1 ∧  b^{26, 28}_0 ∧ true) 
c  in CNF:
c    -b^{26, 28}_2 ∨ -b^{26, 28}_1 ∨ -b^{26, 28}_0 ∨ false 
c  in DIMACS:
-14582 -14583 -14584  0

c i = 29
c  -2+1 --> -1
c    ( b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧  p_754) -> ( b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0)
c  in CNF:
c    -b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨  b^{26, 30}_2
c    -b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_1
c    -b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨  b^{26, 30}_0
c  in DIMACS:
-14585 -14586  14587 -754  14588 0
-14585 -14586  14587 -754 -14589 0
-14585 -14586  14587 -754  14590 0

c  -1+1 --> 0
c    ( b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0 ∧  p_754) -> (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧ -b^{26, 30}_0)
c  in CNF:
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_2
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_1
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_0
c  in DIMACS:
-14585  14586 -14587 -754 -14588 0
-14585  14586 -14587 -754 -14589 0
-14585  14586 -14587 -754 -14590 0

c  0+1 --> 1
c    (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧  p_754) -> (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0)
c  in CNF:
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_2
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_1
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨  b^{26, 30}_0
c  in DIMACS:
 14585  14586  14587 -754 -14588 0
 14585  14586  14587 -754 -14589 0
 14585  14586  14587 -754  14590 0

c  1+1 --> 2
c    (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0 ∧  p_754) -> (-b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0)
c  in CNF:
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_2
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨  b^{26, 30}_1
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ -p_754 ∨ -b^{26, 30}_0
c  in DIMACS:
 14585  14586 -14587 -754 -14588 0
 14585  14586 -14587 -754  14589 0
 14585  14586 -14587 -754 -14590 0

c  2+1 --> break 
c    (-b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧  p_754) -> break
c  in CNF:
c     b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 14585 -14586  14587 -754 1162 0


c  2-1 --> 1
c    (-b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧ -p_754) -> (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0)
c  in CNF:
c     b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_2
c     b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_1
c     b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨  b^{26, 30}_0
c  in DIMACS:
 14585 -14586  14587  754 -14588 0
 14585 -14586  14587  754 -14589 0
 14585 -14586  14587  754  14590 0

c  1-1 --> 0
c    (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0 ∧ -p_754) -> (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧ -b^{26, 30}_0)
c  in CNF:
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_2
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_1
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_0
c  in DIMACS:
 14585  14586 -14587  754 -14588 0
 14585  14586 -14587  754 -14589 0
 14585  14586 -14587  754 -14590 0

c  0-1 --> -1
c    (-b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧ -p_754) -> ( b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0)
c  in CNF:
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨  b^{26, 30}_2
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_1
c     b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨  b^{26, 30}_0
c  in DIMACS:
 14585  14586  14587  754  14588 0
 14585  14586  14587  754 -14589 0
 14585  14586  14587  754  14590 0

c  -1-1 --> -2
c    ( b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧  b^{26, 29}_0 ∧ -p_754) -> ( b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0)
c  in CNF:
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨  b^{26, 30}_2
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨  b^{26, 30}_1
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨  p_754 ∨ -b^{26, 30}_0
c  in DIMACS:
-14585  14586 -14587  754  14588 0
-14585  14586 -14587  754  14589 0
-14585  14586 -14587  754 -14590 0

c  -2-1 --> break 
c    ( b^{26, 29}_2 ∧  b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨  b^{26, 29}_0 ∨  p_754 ∨ break
c  in DIMACS:
-14585 -14586  14587  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 29}_2 ∧ -b^{26, 29}_1 ∧ -b^{26, 29}_0 ∧ true) 
c  in CNF:
c    -b^{26, 29}_2 ∨  b^{26, 29}_1 ∨  b^{26, 29}_0 ∨ false 
c  in DIMACS:
-14585  14586  14587  0

c  3 does not represent an automaton state.
c    -(-b^{26, 29}_2 ∧  b^{26, 29}_1 ∧  b^{26, 29}_0 ∧ true) 
c  in CNF:
c     b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ false 
c  in DIMACS:
 14585 -14586 -14587  0
c  -3 does not represent an automaton state.
c    -( b^{26, 29}_2 ∧  b^{26, 29}_1 ∧  b^{26, 29}_0 ∧ true) 
c  in CNF:
c    -b^{26, 29}_2 ∨ -b^{26, 29}_1 ∨ -b^{26, 29}_0 ∨ false 
c  in DIMACS:
-14585 -14586 -14587  0

c i = 30
c  -2+1 --> -1
c    ( b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧  p_780) -> ( b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0)
c  in CNF:
c    -b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨  b^{26, 31}_2
c    -b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_1
c    -b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨  b^{26, 31}_0
c  in DIMACS:
-14588 -14589  14590 -780  14591 0
-14588 -14589  14590 -780 -14592 0
-14588 -14589  14590 -780  14593 0

c  -1+1 --> 0
c    ( b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0 ∧  p_780) -> (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧ -b^{26, 31}_0)
c  in CNF:
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_2
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_1
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_0
c  in DIMACS:
-14588  14589 -14590 -780 -14591 0
-14588  14589 -14590 -780 -14592 0
-14588  14589 -14590 -780 -14593 0

c  0+1 --> 1
c    (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧  p_780) -> (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0)
c  in CNF:
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_2
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_1
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨  b^{26, 31}_0
c  in DIMACS:
 14588  14589  14590 -780 -14591 0
 14588  14589  14590 -780 -14592 0
 14588  14589  14590 -780  14593 0

c  1+1 --> 2
c    (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0 ∧  p_780) -> (-b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0)
c  in CNF:
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_2
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨  b^{26, 31}_1
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ -p_780 ∨ -b^{26, 31}_0
c  in DIMACS:
 14588  14589 -14590 -780 -14591 0
 14588  14589 -14590 -780  14592 0
 14588  14589 -14590 -780 -14593 0

c  2+1 --> break 
c    (-b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧  p_780) -> break
c  in CNF:
c     b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 14588 -14589  14590 -780 1162 0


c  2-1 --> 1
c    (-b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧ -p_780) -> (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0)
c  in CNF:
c     b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_2
c     b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_1
c     b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨  b^{26, 31}_0
c  in DIMACS:
 14588 -14589  14590  780 -14591 0
 14588 -14589  14590  780 -14592 0
 14588 -14589  14590  780  14593 0

c  1-1 --> 0
c    (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0 ∧ -p_780) -> (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧ -b^{26, 31}_0)
c  in CNF:
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_2
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_1
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_0
c  in DIMACS:
 14588  14589 -14590  780 -14591 0
 14588  14589 -14590  780 -14592 0
 14588  14589 -14590  780 -14593 0

c  0-1 --> -1
c    (-b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧ -p_780) -> ( b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0)
c  in CNF:
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨  b^{26, 31}_2
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_1
c     b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨  b^{26, 31}_0
c  in DIMACS:
 14588  14589  14590  780  14591 0
 14588  14589  14590  780 -14592 0
 14588  14589  14590  780  14593 0

c  -1-1 --> -2
c    ( b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧  b^{26, 30}_0 ∧ -p_780) -> ( b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0)
c  in CNF:
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨  b^{26, 31}_2
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨  b^{26, 31}_1
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨  p_780 ∨ -b^{26, 31}_0
c  in DIMACS:
-14588  14589 -14590  780  14591 0
-14588  14589 -14590  780  14592 0
-14588  14589 -14590  780 -14593 0

c  -2-1 --> break 
c    ( b^{26, 30}_2 ∧  b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨  b^{26, 30}_0 ∨  p_780 ∨ break
c  in DIMACS:
-14588 -14589  14590  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 30}_2 ∧ -b^{26, 30}_1 ∧ -b^{26, 30}_0 ∧ true) 
c  in CNF:
c    -b^{26, 30}_2 ∨  b^{26, 30}_1 ∨  b^{26, 30}_0 ∨ false 
c  in DIMACS:
-14588  14589  14590  0

c  3 does not represent an automaton state.
c    -(-b^{26, 30}_2 ∧  b^{26, 30}_1 ∧  b^{26, 30}_0 ∧ true) 
c  in CNF:
c     b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ false 
c  in DIMACS:
 14588 -14589 -14590  0
c  -3 does not represent an automaton state.
c    -( b^{26, 30}_2 ∧  b^{26, 30}_1 ∧  b^{26, 30}_0 ∧ true) 
c  in CNF:
c    -b^{26, 30}_2 ∨ -b^{26, 30}_1 ∨ -b^{26, 30}_0 ∨ false 
c  in DIMACS:
-14588 -14589 -14590  0

c i = 31
c  -2+1 --> -1
c    ( b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧  p_806) -> ( b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0)
c  in CNF:
c    -b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨  b^{26, 32}_2
c    -b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_1
c    -b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨  b^{26, 32}_0
c  in DIMACS:
-14591 -14592  14593 -806  14594 0
-14591 -14592  14593 -806 -14595 0
-14591 -14592  14593 -806  14596 0

c  -1+1 --> 0
c    ( b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0 ∧  p_806) -> (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧ -b^{26, 32}_0)
c  in CNF:
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_2
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_1
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_0
c  in DIMACS:
-14591  14592 -14593 -806 -14594 0
-14591  14592 -14593 -806 -14595 0
-14591  14592 -14593 -806 -14596 0

c  0+1 --> 1
c    (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧  p_806) -> (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0)
c  in CNF:
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_2
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_1
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨  b^{26, 32}_0
c  in DIMACS:
 14591  14592  14593 -806 -14594 0
 14591  14592  14593 -806 -14595 0
 14591  14592  14593 -806  14596 0

c  1+1 --> 2
c    (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0 ∧  p_806) -> (-b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0)
c  in CNF:
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_2
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨  b^{26, 32}_1
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ -p_806 ∨ -b^{26, 32}_0
c  in DIMACS:
 14591  14592 -14593 -806 -14594 0
 14591  14592 -14593 -806  14595 0
 14591  14592 -14593 -806 -14596 0

c  2+1 --> break 
c    (-b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧  p_806) -> break
c  in CNF:
c     b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 14591 -14592  14593 -806 1162 0


c  2-1 --> 1
c    (-b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧ -p_806) -> (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0)
c  in CNF:
c     b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_2
c     b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_1
c     b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨  b^{26, 32}_0
c  in DIMACS:
 14591 -14592  14593  806 -14594 0
 14591 -14592  14593  806 -14595 0
 14591 -14592  14593  806  14596 0

c  1-1 --> 0
c    (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0 ∧ -p_806) -> (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧ -b^{26, 32}_0)
c  in CNF:
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_2
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_1
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_0
c  in DIMACS:
 14591  14592 -14593  806 -14594 0
 14591  14592 -14593  806 -14595 0
 14591  14592 -14593  806 -14596 0

c  0-1 --> -1
c    (-b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧ -p_806) -> ( b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0)
c  in CNF:
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨  b^{26, 32}_2
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_1
c     b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨  b^{26, 32}_0
c  in DIMACS:
 14591  14592  14593  806  14594 0
 14591  14592  14593  806 -14595 0
 14591  14592  14593  806  14596 0

c  -1-1 --> -2
c    ( b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧  b^{26, 31}_0 ∧ -p_806) -> ( b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0)
c  in CNF:
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨  b^{26, 32}_2
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨  b^{26, 32}_1
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨  p_806 ∨ -b^{26, 32}_0
c  in DIMACS:
-14591  14592 -14593  806  14594 0
-14591  14592 -14593  806  14595 0
-14591  14592 -14593  806 -14596 0

c  -2-1 --> break 
c    ( b^{26, 31}_2 ∧  b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨  b^{26, 31}_0 ∨  p_806 ∨ break
c  in DIMACS:
-14591 -14592  14593  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 31}_2 ∧ -b^{26, 31}_1 ∧ -b^{26, 31}_0 ∧ true) 
c  in CNF:
c    -b^{26, 31}_2 ∨  b^{26, 31}_1 ∨  b^{26, 31}_0 ∨ false 
c  in DIMACS:
-14591  14592  14593  0

c  3 does not represent an automaton state.
c    -(-b^{26, 31}_2 ∧  b^{26, 31}_1 ∧  b^{26, 31}_0 ∧ true) 
c  in CNF:
c     b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ false 
c  in DIMACS:
 14591 -14592 -14593  0
c  -3 does not represent an automaton state.
c    -( b^{26, 31}_2 ∧  b^{26, 31}_1 ∧  b^{26, 31}_0 ∧ true) 
c  in CNF:
c    -b^{26, 31}_2 ∨ -b^{26, 31}_1 ∨ -b^{26, 31}_0 ∨ false 
c  in DIMACS:
-14591 -14592 -14593  0

c i = 32
c  -2+1 --> -1
c    ( b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧  p_832) -> ( b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0)
c  in CNF:
c    -b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨  b^{26, 33}_2
c    -b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_1
c    -b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨  b^{26, 33}_0
c  in DIMACS:
-14594 -14595  14596 -832  14597 0
-14594 -14595  14596 -832 -14598 0
-14594 -14595  14596 -832  14599 0

c  -1+1 --> 0
c    ( b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0 ∧  p_832) -> (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧ -b^{26, 33}_0)
c  in CNF:
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_2
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_1
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_0
c  in DIMACS:
-14594  14595 -14596 -832 -14597 0
-14594  14595 -14596 -832 -14598 0
-14594  14595 -14596 -832 -14599 0

c  0+1 --> 1
c    (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧  p_832) -> (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0)
c  in CNF:
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_2
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_1
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨  b^{26, 33}_0
c  in DIMACS:
 14594  14595  14596 -832 -14597 0
 14594  14595  14596 -832 -14598 0
 14594  14595  14596 -832  14599 0

c  1+1 --> 2
c    (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0 ∧  p_832) -> (-b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0)
c  in CNF:
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_2
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨  b^{26, 33}_1
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ -p_832 ∨ -b^{26, 33}_0
c  in DIMACS:
 14594  14595 -14596 -832 -14597 0
 14594  14595 -14596 -832  14598 0
 14594  14595 -14596 -832 -14599 0

c  2+1 --> break 
c    (-b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧  p_832) -> break
c  in CNF:
c     b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 14594 -14595  14596 -832 1162 0


c  2-1 --> 1
c    (-b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧ -p_832) -> (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0)
c  in CNF:
c     b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_2
c     b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_1
c     b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨  b^{26, 33}_0
c  in DIMACS:
 14594 -14595  14596  832 -14597 0
 14594 -14595  14596  832 -14598 0
 14594 -14595  14596  832  14599 0

c  1-1 --> 0
c    (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0 ∧ -p_832) -> (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧ -b^{26, 33}_0)
c  in CNF:
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_2
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_1
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_0
c  in DIMACS:
 14594  14595 -14596  832 -14597 0
 14594  14595 -14596  832 -14598 0
 14594  14595 -14596  832 -14599 0

c  0-1 --> -1
c    (-b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧ -p_832) -> ( b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0)
c  in CNF:
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨  b^{26, 33}_2
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_1
c     b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨  b^{26, 33}_0
c  in DIMACS:
 14594  14595  14596  832  14597 0
 14594  14595  14596  832 -14598 0
 14594  14595  14596  832  14599 0

c  -1-1 --> -2
c    ( b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧  b^{26, 32}_0 ∧ -p_832) -> ( b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0)
c  in CNF:
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨  b^{26, 33}_2
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨  b^{26, 33}_1
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨  p_832 ∨ -b^{26, 33}_0
c  in DIMACS:
-14594  14595 -14596  832  14597 0
-14594  14595 -14596  832  14598 0
-14594  14595 -14596  832 -14599 0

c  -2-1 --> break 
c    ( b^{26, 32}_2 ∧  b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨  b^{26, 32}_0 ∨  p_832 ∨ break
c  in DIMACS:
-14594 -14595  14596  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 32}_2 ∧ -b^{26, 32}_1 ∧ -b^{26, 32}_0 ∧ true) 
c  in CNF:
c    -b^{26, 32}_2 ∨  b^{26, 32}_1 ∨  b^{26, 32}_0 ∨ false 
c  in DIMACS:
-14594  14595  14596  0

c  3 does not represent an automaton state.
c    -(-b^{26, 32}_2 ∧  b^{26, 32}_1 ∧  b^{26, 32}_0 ∧ true) 
c  in CNF:
c     b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ false 
c  in DIMACS:
 14594 -14595 -14596  0
c  -3 does not represent an automaton state.
c    -( b^{26, 32}_2 ∧  b^{26, 32}_1 ∧  b^{26, 32}_0 ∧ true) 
c  in CNF:
c    -b^{26, 32}_2 ∨ -b^{26, 32}_1 ∨ -b^{26, 32}_0 ∨ false 
c  in DIMACS:
-14594 -14595 -14596  0

c i = 33
c  -2+1 --> -1
c    ( b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧  p_858) -> ( b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0)
c  in CNF:
c    -b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨  b^{26, 34}_2
c    -b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_1
c    -b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨  b^{26, 34}_0
c  in DIMACS:
-14597 -14598  14599 -858  14600 0
-14597 -14598  14599 -858 -14601 0
-14597 -14598  14599 -858  14602 0

c  -1+1 --> 0
c    ( b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0 ∧  p_858) -> (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧ -b^{26, 34}_0)
c  in CNF:
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_2
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_1
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_0
c  in DIMACS:
-14597  14598 -14599 -858 -14600 0
-14597  14598 -14599 -858 -14601 0
-14597  14598 -14599 -858 -14602 0

c  0+1 --> 1
c    (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧  p_858) -> (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0)
c  in CNF:
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_2
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_1
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨  b^{26, 34}_0
c  in DIMACS:
 14597  14598  14599 -858 -14600 0
 14597  14598  14599 -858 -14601 0
 14597  14598  14599 -858  14602 0

c  1+1 --> 2
c    (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0 ∧  p_858) -> (-b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0)
c  in CNF:
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_2
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨  b^{26, 34}_1
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ -p_858 ∨ -b^{26, 34}_0
c  in DIMACS:
 14597  14598 -14599 -858 -14600 0
 14597  14598 -14599 -858  14601 0
 14597  14598 -14599 -858 -14602 0

c  2+1 --> break 
c    (-b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧  p_858) -> break
c  in CNF:
c     b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 14597 -14598  14599 -858 1162 0


c  2-1 --> 1
c    (-b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧ -p_858) -> (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0)
c  in CNF:
c     b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_2
c     b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_1
c     b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨  b^{26, 34}_0
c  in DIMACS:
 14597 -14598  14599  858 -14600 0
 14597 -14598  14599  858 -14601 0
 14597 -14598  14599  858  14602 0

c  1-1 --> 0
c    (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0 ∧ -p_858) -> (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧ -b^{26, 34}_0)
c  in CNF:
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_2
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_1
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_0
c  in DIMACS:
 14597  14598 -14599  858 -14600 0
 14597  14598 -14599  858 -14601 0
 14597  14598 -14599  858 -14602 0

c  0-1 --> -1
c    (-b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧ -p_858) -> ( b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0)
c  in CNF:
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨  b^{26, 34}_2
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_1
c     b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨  b^{26, 34}_0
c  in DIMACS:
 14597  14598  14599  858  14600 0
 14597  14598  14599  858 -14601 0
 14597  14598  14599  858  14602 0

c  -1-1 --> -2
c    ( b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧  b^{26, 33}_0 ∧ -p_858) -> ( b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0)
c  in CNF:
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨  b^{26, 34}_2
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨  b^{26, 34}_1
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨  p_858 ∨ -b^{26, 34}_0
c  in DIMACS:
-14597  14598 -14599  858  14600 0
-14597  14598 -14599  858  14601 0
-14597  14598 -14599  858 -14602 0

c  -2-1 --> break 
c    ( b^{26, 33}_2 ∧  b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨  b^{26, 33}_0 ∨  p_858 ∨ break
c  in DIMACS:
-14597 -14598  14599  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 33}_2 ∧ -b^{26, 33}_1 ∧ -b^{26, 33}_0 ∧ true) 
c  in CNF:
c    -b^{26, 33}_2 ∨  b^{26, 33}_1 ∨  b^{26, 33}_0 ∨ false 
c  in DIMACS:
-14597  14598  14599  0

c  3 does not represent an automaton state.
c    -(-b^{26, 33}_2 ∧  b^{26, 33}_1 ∧  b^{26, 33}_0 ∧ true) 
c  in CNF:
c     b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ false 
c  in DIMACS:
 14597 -14598 -14599  0
c  -3 does not represent an automaton state.
c    -( b^{26, 33}_2 ∧  b^{26, 33}_1 ∧  b^{26, 33}_0 ∧ true) 
c  in CNF:
c    -b^{26, 33}_2 ∨ -b^{26, 33}_1 ∨ -b^{26, 33}_0 ∨ false 
c  in DIMACS:
-14597 -14598 -14599  0

c i = 34
c  -2+1 --> -1
c    ( b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧  p_884) -> ( b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0)
c  in CNF:
c    -b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨  b^{26, 35}_2
c    -b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_1
c    -b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨  b^{26, 35}_0
c  in DIMACS:
-14600 -14601  14602 -884  14603 0
-14600 -14601  14602 -884 -14604 0
-14600 -14601  14602 -884  14605 0

c  -1+1 --> 0
c    ( b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0 ∧  p_884) -> (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧ -b^{26, 35}_0)
c  in CNF:
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_2
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_1
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_0
c  in DIMACS:
-14600  14601 -14602 -884 -14603 0
-14600  14601 -14602 -884 -14604 0
-14600  14601 -14602 -884 -14605 0

c  0+1 --> 1
c    (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧  p_884) -> (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0)
c  in CNF:
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_2
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_1
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨  b^{26, 35}_0
c  in DIMACS:
 14600  14601  14602 -884 -14603 0
 14600  14601  14602 -884 -14604 0
 14600  14601  14602 -884  14605 0

c  1+1 --> 2
c    (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0 ∧  p_884) -> (-b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0)
c  in CNF:
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_2
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨  b^{26, 35}_1
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ -p_884 ∨ -b^{26, 35}_0
c  in DIMACS:
 14600  14601 -14602 -884 -14603 0
 14600  14601 -14602 -884  14604 0
 14600  14601 -14602 -884 -14605 0

c  2+1 --> break 
c    (-b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧  p_884) -> break
c  in CNF:
c     b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 14600 -14601  14602 -884 1162 0


c  2-1 --> 1
c    (-b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧ -p_884) -> (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0)
c  in CNF:
c     b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_2
c     b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_1
c     b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨  b^{26, 35}_0
c  in DIMACS:
 14600 -14601  14602  884 -14603 0
 14600 -14601  14602  884 -14604 0
 14600 -14601  14602  884  14605 0

c  1-1 --> 0
c    (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0 ∧ -p_884) -> (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧ -b^{26, 35}_0)
c  in CNF:
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_2
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_1
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_0
c  in DIMACS:
 14600  14601 -14602  884 -14603 0
 14600  14601 -14602  884 -14604 0
 14600  14601 -14602  884 -14605 0

c  0-1 --> -1
c    (-b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧ -p_884) -> ( b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0)
c  in CNF:
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨  b^{26, 35}_2
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_1
c     b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨  b^{26, 35}_0
c  in DIMACS:
 14600  14601  14602  884  14603 0
 14600  14601  14602  884 -14604 0
 14600  14601  14602  884  14605 0

c  -1-1 --> -2
c    ( b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧  b^{26, 34}_0 ∧ -p_884) -> ( b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0)
c  in CNF:
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨  b^{26, 35}_2
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨  b^{26, 35}_1
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨  p_884 ∨ -b^{26, 35}_0
c  in DIMACS:
-14600  14601 -14602  884  14603 0
-14600  14601 -14602  884  14604 0
-14600  14601 -14602  884 -14605 0

c  -2-1 --> break 
c    ( b^{26, 34}_2 ∧  b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨  b^{26, 34}_0 ∨  p_884 ∨ break
c  in DIMACS:
-14600 -14601  14602  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 34}_2 ∧ -b^{26, 34}_1 ∧ -b^{26, 34}_0 ∧ true) 
c  in CNF:
c    -b^{26, 34}_2 ∨  b^{26, 34}_1 ∨  b^{26, 34}_0 ∨ false 
c  in DIMACS:
-14600  14601  14602  0

c  3 does not represent an automaton state.
c    -(-b^{26, 34}_2 ∧  b^{26, 34}_1 ∧  b^{26, 34}_0 ∧ true) 
c  in CNF:
c     b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ false 
c  in DIMACS:
 14600 -14601 -14602  0
c  -3 does not represent an automaton state.
c    -( b^{26, 34}_2 ∧  b^{26, 34}_1 ∧  b^{26, 34}_0 ∧ true) 
c  in CNF:
c    -b^{26, 34}_2 ∨ -b^{26, 34}_1 ∨ -b^{26, 34}_0 ∨ false 
c  in DIMACS:
-14600 -14601 -14602  0

c i = 35
c  -2+1 --> -1
c    ( b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧  p_910) -> ( b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0)
c  in CNF:
c    -b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨  b^{26, 36}_2
c    -b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_1
c    -b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨  b^{26, 36}_0
c  in DIMACS:
-14603 -14604  14605 -910  14606 0
-14603 -14604  14605 -910 -14607 0
-14603 -14604  14605 -910  14608 0

c  -1+1 --> 0
c    ( b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0 ∧  p_910) -> (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧ -b^{26, 36}_0)
c  in CNF:
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_2
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_1
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_0
c  in DIMACS:
-14603  14604 -14605 -910 -14606 0
-14603  14604 -14605 -910 -14607 0
-14603  14604 -14605 -910 -14608 0

c  0+1 --> 1
c    (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧  p_910) -> (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0)
c  in CNF:
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_2
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_1
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨  b^{26, 36}_0
c  in DIMACS:
 14603  14604  14605 -910 -14606 0
 14603  14604  14605 -910 -14607 0
 14603  14604  14605 -910  14608 0

c  1+1 --> 2
c    (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0 ∧  p_910) -> (-b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0)
c  in CNF:
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_2
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨  b^{26, 36}_1
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ -p_910 ∨ -b^{26, 36}_0
c  in DIMACS:
 14603  14604 -14605 -910 -14606 0
 14603  14604 -14605 -910  14607 0
 14603  14604 -14605 -910 -14608 0

c  2+1 --> break 
c    (-b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧  p_910) -> break
c  in CNF:
c     b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 14603 -14604  14605 -910 1162 0


c  2-1 --> 1
c    (-b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧ -p_910) -> (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0)
c  in CNF:
c     b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_2
c     b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_1
c     b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨  b^{26, 36}_0
c  in DIMACS:
 14603 -14604  14605  910 -14606 0
 14603 -14604  14605  910 -14607 0
 14603 -14604  14605  910  14608 0

c  1-1 --> 0
c    (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0 ∧ -p_910) -> (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧ -b^{26, 36}_0)
c  in CNF:
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_2
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_1
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_0
c  in DIMACS:
 14603  14604 -14605  910 -14606 0
 14603  14604 -14605  910 -14607 0
 14603  14604 -14605  910 -14608 0

c  0-1 --> -1
c    (-b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧ -p_910) -> ( b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0)
c  in CNF:
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨  b^{26, 36}_2
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_1
c     b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨  b^{26, 36}_0
c  in DIMACS:
 14603  14604  14605  910  14606 0
 14603  14604  14605  910 -14607 0
 14603  14604  14605  910  14608 0

c  -1-1 --> -2
c    ( b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧  b^{26, 35}_0 ∧ -p_910) -> ( b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0)
c  in CNF:
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨  b^{26, 36}_2
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨  b^{26, 36}_1
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨  p_910 ∨ -b^{26, 36}_0
c  in DIMACS:
-14603  14604 -14605  910  14606 0
-14603  14604 -14605  910  14607 0
-14603  14604 -14605  910 -14608 0

c  -2-1 --> break 
c    ( b^{26, 35}_2 ∧  b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨  b^{26, 35}_0 ∨  p_910 ∨ break
c  in DIMACS:
-14603 -14604  14605  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 35}_2 ∧ -b^{26, 35}_1 ∧ -b^{26, 35}_0 ∧ true) 
c  in CNF:
c    -b^{26, 35}_2 ∨  b^{26, 35}_1 ∨  b^{26, 35}_0 ∨ false 
c  in DIMACS:
-14603  14604  14605  0

c  3 does not represent an automaton state.
c    -(-b^{26, 35}_2 ∧  b^{26, 35}_1 ∧  b^{26, 35}_0 ∧ true) 
c  in CNF:
c     b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ false 
c  in DIMACS:
 14603 -14604 -14605  0
c  -3 does not represent an automaton state.
c    -( b^{26, 35}_2 ∧  b^{26, 35}_1 ∧  b^{26, 35}_0 ∧ true) 
c  in CNF:
c    -b^{26, 35}_2 ∨ -b^{26, 35}_1 ∨ -b^{26, 35}_0 ∨ false 
c  in DIMACS:
-14603 -14604 -14605  0

c i = 36
c  -2+1 --> -1
c    ( b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧  p_936) -> ( b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0)
c  in CNF:
c    -b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨  b^{26, 37}_2
c    -b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_1
c    -b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨  b^{26, 37}_0
c  in DIMACS:
-14606 -14607  14608 -936  14609 0
-14606 -14607  14608 -936 -14610 0
-14606 -14607  14608 -936  14611 0

c  -1+1 --> 0
c    ( b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0 ∧  p_936) -> (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧ -b^{26, 37}_0)
c  in CNF:
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_2
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_1
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_0
c  in DIMACS:
-14606  14607 -14608 -936 -14609 0
-14606  14607 -14608 -936 -14610 0
-14606  14607 -14608 -936 -14611 0

c  0+1 --> 1
c    (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧  p_936) -> (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0)
c  in CNF:
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_2
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_1
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨  b^{26, 37}_0
c  in DIMACS:
 14606  14607  14608 -936 -14609 0
 14606  14607  14608 -936 -14610 0
 14606  14607  14608 -936  14611 0

c  1+1 --> 2
c    (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0 ∧  p_936) -> (-b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0)
c  in CNF:
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_2
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨  b^{26, 37}_1
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ -p_936 ∨ -b^{26, 37}_0
c  in DIMACS:
 14606  14607 -14608 -936 -14609 0
 14606  14607 -14608 -936  14610 0
 14606  14607 -14608 -936 -14611 0

c  2+1 --> break 
c    (-b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧  p_936) -> break
c  in CNF:
c     b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 14606 -14607  14608 -936 1162 0


c  2-1 --> 1
c    (-b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧ -p_936) -> (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0)
c  in CNF:
c     b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_2
c     b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_1
c     b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨  b^{26, 37}_0
c  in DIMACS:
 14606 -14607  14608  936 -14609 0
 14606 -14607  14608  936 -14610 0
 14606 -14607  14608  936  14611 0

c  1-1 --> 0
c    (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0 ∧ -p_936) -> (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧ -b^{26, 37}_0)
c  in CNF:
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_2
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_1
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_0
c  in DIMACS:
 14606  14607 -14608  936 -14609 0
 14606  14607 -14608  936 -14610 0
 14606  14607 -14608  936 -14611 0

c  0-1 --> -1
c    (-b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧ -p_936) -> ( b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0)
c  in CNF:
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨  b^{26, 37}_2
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_1
c     b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨  b^{26, 37}_0
c  in DIMACS:
 14606  14607  14608  936  14609 0
 14606  14607  14608  936 -14610 0
 14606  14607  14608  936  14611 0

c  -1-1 --> -2
c    ( b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧  b^{26, 36}_0 ∧ -p_936) -> ( b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0)
c  in CNF:
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨  b^{26, 37}_2
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨  b^{26, 37}_1
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨  p_936 ∨ -b^{26, 37}_0
c  in DIMACS:
-14606  14607 -14608  936  14609 0
-14606  14607 -14608  936  14610 0
-14606  14607 -14608  936 -14611 0

c  -2-1 --> break 
c    ( b^{26, 36}_2 ∧  b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨  b^{26, 36}_0 ∨  p_936 ∨ break
c  in DIMACS:
-14606 -14607  14608  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 36}_2 ∧ -b^{26, 36}_1 ∧ -b^{26, 36}_0 ∧ true) 
c  in CNF:
c    -b^{26, 36}_2 ∨  b^{26, 36}_1 ∨  b^{26, 36}_0 ∨ false 
c  in DIMACS:
-14606  14607  14608  0

c  3 does not represent an automaton state.
c    -(-b^{26, 36}_2 ∧  b^{26, 36}_1 ∧  b^{26, 36}_0 ∧ true) 
c  in CNF:
c     b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ false 
c  in DIMACS:
 14606 -14607 -14608  0
c  -3 does not represent an automaton state.
c    -( b^{26, 36}_2 ∧  b^{26, 36}_1 ∧  b^{26, 36}_0 ∧ true) 
c  in CNF:
c    -b^{26, 36}_2 ∨ -b^{26, 36}_1 ∨ -b^{26, 36}_0 ∨ false 
c  in DIMACS:
-14606 -14607 -14608  0

c i = 37
c  -2+1 --> -1
c    ( b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧  p_962) -> ( b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0)
c  in CNF:
c    -b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨  b^{26, 38}_2
c    -b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_1
c    -b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨  b^{26, 38}_0
c  in DIMACS:
-14609 -14610  14611 -962  14612 0
-14609 -14610  14611 -962 -14613 0
-14609 -14610  14611 -962  14614 0

c  -1+1 --> 0
c    ( b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0 ∧  p_962) -> (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧ -b^{26, 38}_0)
c  in CNF:
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_2
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_1
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_0
c  in DIMACS:
-14609  14610 -14611 -962 -14612 0
-14609  14610 -14611 -962 -14613 0
-14609  14610 -14611 -962 -14614 0

c  0+1 --> 1
c    (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧  p_962) -> (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0)
c  in CNF:
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_2
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_1
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨  b^{26, 38}_0
c  in DIMACS:
 14609  14610  14611 -962 -14612 0
 14609  14610  14611 -962 -14613 0
 14609  14610  14611 -962  14614 0

c  1+1 --> 2
c    (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0 ∧  p_962) -> (-b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0)
c  in CNF:
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_2
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨  b^{26, 38}_1
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ -p_962 ∨ -b^{26, 38}_0
c  in DIMACS:
 14609  14610 -14611 -962 -14612 0
 14609  14610 -14611 -962  14613 0
 14609  14610 -14611 -962 -14614 0

c  2+1 --> break 
c    (-b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧  p_962) -> break
c  in CNF:
c     b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 14609 -14610  14611 -962 1162 0


c  2-1 --> 1
c    (-b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧ -p_962) -> (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0)
c  in CNF:
c     b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_2
c     b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_1
c     b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨  b^{26, 38}_0
c  in DIMACS:
 14609 -14610  14611  962 -14612 0
 14609 -14610  14611  962 -14613 0
 14609 -14610  14611  962  14614 0

c  1-1 --> 0
c    (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0 ∧ -p_962) -> (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧ -b^{26, 38}_0)
c  in CNF:
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_2
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_1
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_0
c  in DIMACS:
 14609  14610 -14611  962 -14612 0
 14609  14610 -14611  962 -14613 0
 14609  14610 -14611  962 -14614 0

c  0-1 --> -1
c    (-b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧ -p_962) -> ( b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0)
c  in CNF:
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨  b^{26, 38}_2
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_1
c     b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨  b^{26, 38}_0
c  in DIMACS:
 14609  14610  14611  962  14612 0
 14609  14610  14611  962 -14613 0
 14609  14610  14611  962  14614 0

c  -1-1 --> -2
c    ( b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧  b^{26, 37}_0 ∧ -p_962) -> ( b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0)
c  in CNF:
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨  b^{26, 38}_2
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨  b^{26, 38}_1
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨  p_962 ∨ -b^{26, 38}_0
c  in DIMACS:
-14609  14610 -14611  962  14612 0
-14609  14610 -14611  962  14613 0
-14609  14610 -14611  962 -14614 0

c  -2-1 --> break 
c    ( b^{26, 37}_2 ∧  b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨  b^{26, 37}_0 ∨  p_962 ∨ break
c  in DIMACS:
-14609 -14610  14611  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 37}_2 ∧ -b^{26, 37}_1 ∧ -b^{26, 37}_0 ∧ true) 
c  in CNF:
c    -b^{26, 37}_2 ∨  b^{26, 37}_1 ∨  b^{26, 37}_0 ∨ false 
c  in DIMACS:
-14609  14610  14611  0

c  3 does not represent an automaton state.
c    -(-b^{26, 37}_2 ∧  b^{26, 37}_1 ∧  b^{26, 37}_0 ∧ true) 
c  in CNF:
c     b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ false 
c  in DIMACS:
 14609 -14610 -14611  0
c  -3 does not represent an automaton state.
c    -( b^{26, 37}_2 ∧  b^{26, 37}_1 ∧  b^{26, 37}_0 ∧ true) 
c  in CNF:
c    -b^{26, 37}_2 ∨ -b^{26, 37}_1 ∨ -b^{26, 37}_0 ∨ false 
c  in DIMACS:
-14609 -14610 -14611  0

c i = 38
c  -2+1 --> -1
c    ( b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧  p_988) -> ( b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0)
c  in CNF:
c    -b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨  b^{26, 39}_2
c    -b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_1
c    -b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨  b^{26, 39}_0
c  in DIMACS:
-14612 -14613  14614 -988  14615 0
-14612 -14613  14614 -988 -14616 0
-14612 -14613  14614 -988  14617 0

c  -1+1 --> 0
c    ( b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0 ∧  p_988) -> (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧ -b^{26, 39}_0)
c  in CNF:
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_2
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_1
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_0
c  in DIMACS:
-14612  14613 -14614 -988 -14615 0
-14612  14613 -14614 -988 -14616 0
-14612  14613 -14614 -988 -14617 0

c  0+1 --> 1
c    (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧  p_988) -> (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0)
c  in CNF:
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_2
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_1
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨  b^{26, 39}_0
c  in DIMACS:
 14612  14613  14614 -988 -14615 0
 14612  14613  14614 -988 -14616 0
 14612  14613  14614 -988  14617 0

c  1+1 --> 2
c    (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0 ∧  p_988) -> (-b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0)
c  in CNF:
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_2
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨  b^{26, 39}_1
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ -p_988 ∨ -b^{26, 39}_0
c  in DIMACS:
 14612  14613 -14614 -988 -14615 0
 14612  14613 -14614 -988  14616 0
 14612  14613 -14614 -988 -14617 0

c  2+1 --> break 
c    (-b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧  p_988) -> break
c  in CNF:
c     b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 14612 -14613  14614 -988 1162 0


c  2-1 --> 1
c    (-b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧ -p_988) -> (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0)
c  in CNF:
c     b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_2
c     b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_1
c     b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨  b^{26, 39}_0
c  in DIMACS:
 14612 -14613  14614  988 -14615 0
 14612 -14613  14614  988 -14616 0
 14612 -14613  14614  988  14617 0

c  1-1 --> 0
c    (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0 ∧ -p_988) -> (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧ -b^{26, 39}_0)
c  in CNF:
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_2
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_1
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_0
c  in DIMACS:
 14612  14613 -14614  988 -14615 0
 14612  14613 -14614  988 -14616 0
 14612  14613 -14614  988 -14617 0

c  0-1 --> -1
c    (-b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧ -p_988) -> ( b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0)
c  in CNF:
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨  b^{26, 39}_2
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_1
c     b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨  b^{26, 39}_0
c  in DIMACS:
 14612  14613  14614  988  14615 0
 14612  14613  14614  988 -14616 0
 14612  14613  14614  988  14617 0

c  -1-1 --> -2
c    ( b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧  b^{26, 38}_0 ∧ -p_988) -> ( b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0)
c  in CNF:
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨  b^{26, 39}_2
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨  b^{26, 39}_1
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨  p_988 ∨ -b^{26, 39}_0
c  in DIMACS:
-14612  14613 -14614  988  14615 0
-14612  14613 -14614  988  14616 0
-14612  14613 -14614  988 -14617 0

c  -2-1 --> break 
c    ( b^{26, 38}_2 ∧  b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨  b^{26, 38}_0 ∨  p_988 ∨ break
c  in DIMACS:
-14612 -14613  14614  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 38}_2 ∧ -b^{26, 38}_1 ∧ -b^{26, 38}_0 ∧ true) 
c  in CNF:
c    -b^{26, 38}_2 ∨  b^{26, 38}_1 ∨  b^{26, 38}_0 ∨ false 
c  in DIMACS:
-14612  14613  14614  0

c  3 does not represent an automaton state.
c    -(-b^{26, 38}_2 ∧  b^{26, 38}_1 ∧  b^{26, 38}_0 ∧ true) 
c  in CNF:
c     b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ false 
c  in DIMACS:
 14612 -14613 -14614  0
c  -3 does not represent an automaton state.
c    -( b^{26, 38}_2 ∧  b^{26, 38}_1 ∧  b^{26, 38}_0 ∧ true) 
c  in CNF:
c    -b^{26, 38}_2 ∨ -b^{26, 38}_1 ∨ -b^{26, 38}_0 ∨ false 
c  in DIMACS:
-14612 -14613 -14614  0

c i = 39
c  -2+1 --> -1
c    ( b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧  p_1014) -> ( b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0)
c  in CNF:
c    -b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨  b^{26, 40}_2
c    -b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_1
c    -b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨  b^{26, 40}_0
c  in DIMACS:
-14615 -14616  14617 -1014  14618 0
-14615 -14616  14617 -1014 -14619 0
-14615 -14616  14617 -1014  14620 0

c  -1+1 --> 0
c    ( b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0 ∧  p_1014) -> (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧ -b^{26, 40}_0)
c  in CNF:
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_2
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_1
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_0
c  in DIMACS:
-14615  14616 -14617 -1014 -14618 0
-14615  14616 -14617 -1014 -14619 0
-14615  14616 -14617 -1014 -14620 0

c  0+1 --> 1
c    (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧  p_1014) -> (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0)
c  in CNF:
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_2
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_1
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨  b^{26, 40}_0
c  in DIMACS:
 14615  14616  14617 -1014 -14618 0
 14615  14616  14617 -1014 -14619 0
 14615  14616  14617 -1014  14620 0

c  1+1 --> 2
c    (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0 ∧  p_1014) -> (-b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0)
c  in CNF:
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_2
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨  b^{26, 40}_1
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ -p_1014 ∨ -b^{26, 40}_0
c  in DIMACS:
 14615  14616 -14617 -1014 -14618 0
 14615  14616 -14617 -1014  14619 0
 14615  14616 -14617 -1014 -14620 0

c  2+1 --> break 
c    (-b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 14615 -14616  14617 -1014 1162 0


c  2-1 --> 1
c    (-b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧ -p_1014) -> (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0)
c  in CNF:
c     b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_2
c     b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_1
c     b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨  b^{26, 40}_0
c  in DIMACS:
 14615 -14616  14617  1014 -14618 0
 14615 -14616  14617  1014 -14619 0
 14615 -14616  14617  1014  14620 0

c  1-1 --> 0
c    (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0 ∧ -p_1014) -> (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧ -b^{26, 40}_0)
c  in CNF:
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_2
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_1
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_0
c  in DIMACS:
 14615  14616 -14617  1014 -14618 0
 14615  14616 -14617  1014 -14619 0
 14615  14616 -14617  1014 -14620 0

c  0-1 --> -1
c    (-b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧ -p_1014) -> ( b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0)
c  in CNF:
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨  b^{26, 40}_2
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_1
c     b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨  b^{26, 40}_0
c  in DIMACS:
 14615  14616  14617  1014  14618 0
 14615  14616  14617  1014 -14619 0
 14615  14616  14617  1014  14620 0

c  -1-1 --> -2
c    ( b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧  b^{26, 39}_0 ∧ -p_1014) -> ( b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0)
c  in CNF:
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨  b^{26, 40}_2
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨  b^{26, 40}_1
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨  p_1014 ∨ -b^{26, 40}_0
c  in DIMACS:
-14615  14616 -14617  1014  14618 0
-14615  14616 -14617  1014  14619 0
-14615  14616 -14617  1014 -14620 0

c  -2-1 --> break 
c    ( b^{26, 39}_2 ∧  b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨  b^{26, 39}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-14615 -14616  14617  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 39}_2 ∧ -b^{26, 39}_1 ∧ -b^{26, 39}_0 ∧ true) 
c  in CNF:
c    -b^{26, 39}_2 ∨  b^{26, 39}_1 ∨  b^{26, 39}_0 ∨ false 
c  in DIMACS:
-14615  14616  14617  0

c  3 does not represent an automaton state.
c    -(-b^{26, 39}_2 ∧  b^{26, 39}_1 ∧  b^{26, 39}_0 ∧ true) 
c  in CNF:
c     b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ false 
c  in DIMACS:
 14615 -14616 -14617  0
c  -3 does not represent an automaton state.
c    -( b^{26, 39}_2 ∧  b^{26, 39}_1 ∧  b^{26, 39}_0 ∧ true) 
c  in CNF:
c    -b^{26, 39}_2 ∨ -b^{26, 39}_1 ∨ -b^{26, 39}_0 ∨ false 
c  in DIMACS:
-14615 -14616 -14617  0

c i = 40
c  -2+1 --> -1
c    ( b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧  p_1040) -> ( b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0)
c  in CNF:
c    -b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨  b^{26, 41}_2
c    -b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_1
c    -b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨  b^{26, 41}_0
c  in DIMACS:
-14618 -14619  14620 -1040  14621 0
-14618 -14619  14620 -1040 -14622 0
-14618 -14619  14620 -1040  14623 0

c  -1+1 --> 0
c    ( b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0 ∧  p_1040) -> (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧ -b^{26, 41}_0)
c  in CNF:
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_2
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_1
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_0
c  in DIMACS:
-14618  14619 -14620 -1040 -14621 0
-14618  14619 -14620 -1040 -14622 0
-14618  14619 -14620 -1040 -14623 0

c  0+1 --> 1
c    (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧  p_1040) -> (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0)
c  in CNF:
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_2
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_1
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨  b^{26, 41}_0
c  in DIMACS:
 14618  14619  14620 -1040 -14621 0
 14618  14619  14620 -1040 -14622 0
 14618  14619  14620 -1040  14623 0

c  1+1 --> 2
c    (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0 ∧  p_1040) -> (-b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0)
c  in CNF:
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_2
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨  b^{26, 41}_1
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ -p_1040 ∨ -b^{26, 41}_0
c  in DIMACS:
 14618  14619 -14620 -1040 -14621 0
 14618  14619 -14620 -1040  14622 0
 14618  14619 -14620 -1040 -14623 0

c  2+1 --> break 
c    (-b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 14618 -14619  14620 -1040 1162 0


c  2-1 --> 1
c    (-b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧ -p_1040) -> (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0)
c  in CNF:
c     b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_2
c     b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_1
c     b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨  b^{26, 41}_0
c  in DIMACS:
 14618 -14619  14620  1040 -14621 0
 14618 -14619  14620  1040 -14622 0
 14618 -14619  14620  1040  14623 0

c  1-1 --> 0
c    (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0 ∧ -p_1040) -> (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧ -b^{26, 41}_0)
c  in CNF:
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_2
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_1
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_0
c  in DIMACS:
 14618  14619 -14620  1040 -14621 0
 14618  14619 -14620  1040 -14622 0
 14618  14619 -14620  1040 -14623 0

c  0-1 --> -1
c    (-b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧ -p_1040) -> ( b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0)
c  in CNF:
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨  b^{26, 41}_2
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_1
c     b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨  b^{26, 41}_0
c  in DIMACS:
 14618  14619  14620  1040  14621 0
 14618  14619  14620  1040 -14622 0
 14618  14619  14620  1040  14623 0

c  -1-1 --> -2
c    ( b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧  b^{26, 40}_0 ∧ -p_1040) -> ( b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0)
c  in CNF:
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨  b^{26, 41}_2
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨  b^{26, 41}_1
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨  p_1040 ∨ -b^{26, 41}_0
c  in DIMACS:
-14618  14619 -14620  1040  14621 0
-14618  14619 -14620  1040  14622 0
-14618  14619 -14620  1040 -14623 0

c  -2-1 --> break 
c    ( b^{26, 40}_2 ∧  b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨  b^{26, 40}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-14618 -14619  14620  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 40}_2 ∧ -b^{26, 40}_1 ∧ -b^{26, 40}_0 ∧ true) 
c  in CNF:
c    -b^{26, 40}_2 ∨  b^{26, 40}_1 ∨  b^{26, 40}_0 ∨ false 
c  in DIMACS:
-14618  14619  14620  0

c  3 does not represent an automaton state.
c    -(-b^{26, 40}_2 ∧  b^{26, 40}_1 ∧  b^{26, 40}_0 ∧ true) 
c  in CNF:
c     b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ false 
c  in DIMACS:
 14618 -14619 -14620  0
c  -3 does not represent an automaton state.
c    -( b^{26, 40}_2 ∧  b^{26, 40}_1 ∧  b^{26, 40}_0 ∧ true) 
c  in CNF:
c    -b^{26, 40}_2 ∨ -b^{26, 40}_1 ∨ -b^{26, 40}_0 ∨ false 
c  in DIMACS:
-14618 -14619 -14620  0

c i = 41
c  -2+1 --> -1
c    ( b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧  p_1066) -> ( b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0)
c  in CNF:
c    -b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨  b^{26, 42}_2
c    -b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_1
c    -b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨  b^{26, 42}_0
c  in DIMACS:
-14621 -14622  14623 -1066  14624 0
-14621 -14622  14623 -1066 -14625 0
-14621 -14622  14623 -1066  14626 0

c  -1+1 --> 0
c    ( b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0 ∧  p_1066) -> (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧ -b^{26, 42}_0)
c  in CNF:
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_2
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_1
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_0
c  in DIMACS:
-14621  14622 -14623 -1066 -14624 0
-14621  14622 -14623 -1066 -14625 0
-14621  14622 -14623 -1066 -14626 0

c  0+1 --> 1
c    (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧  p_1066) -> (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0)
c  in CNF:
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_2
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_1
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨  b^{26, 42}_0
c  in DIMACS:
 14621  14622  14623 -1066 -14624 0
 14621  14622  14623 -1066 -14625 0
 14621  14622  14623 -1066  14626 0

c  1+1 --> 2
c    (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0 ∧  p_1066) -> (-b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0)
c  in CNF:
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_2
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨  b^{26, 42}_1
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ -p_1066 ∨ -b^{26, 42}_0
c  in DIMACS:
 14621  14622 -14623 -1066 -14624 0
 14621  14622 -14623 -1066  14625 0
 14621  14622 -14623 -1066 -14626 0

c  2+1 --> break 
c    (-b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 14621 -14622  14623 -1066 1162 0


c  2-1 --> 1
c    (-b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧ -p_1066) -> (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0)
c  in CNF:
c     b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_2
c     b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_1
c     b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨  b^{26, 42}_0
c  in DIMACS:
 14621 -14622  14623  1066 -14624 0
 14621 -14622  14623  1066 -14625 0
 14621 -14622  14623  1066  14626 0

c  1-1 --> 0
c    (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0 ∧ -p_1066) -> (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧ -b^{26, 42}_0)
c  in CNF:
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_2
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_1
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_0
c  in DIMACS:
 14621  14622 -14623  1066 -14624 0
 14621  14622 -14623  1066 -14625 0
 14621  14622 -14623  1066 -14626 0

c  0-1 --> -1
c    (-b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧ -p_1066) -> ( b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0)
c  in CNF:
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨  b^{26, 42}_2
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_1
c     b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨  b^{26, 42}_0
c  in DIMACS:
 14621  14622  14623  1066  14624 0
 14621  14622  14623  1066 -14625 0
 14621  14622  14623  1066  14626 0

c  -1-1 --> -2
c    ( b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧  b^{26, 41}_0 ∧ -p_1066) -> ( b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0)
c  in CNF:
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨  b^{26, 42}_2
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨  b^{26, 42}_1
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨  p_1066 ∨ -b^{26, 42}_0
c  in DIMACS:
-14621  14622 -14623  1066  14624 0
-14621  14622 -14623  1066  14625 0
-14621  14622 -14623  1066 -14626 0

c  -2-1 --> break 
c    ( b^{26, 41}_2 ∧  b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨  b^{26, 41}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-14621 -14622  14623  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 41}_2 ∧ -b^{26, 41}_1 ∧ -b^{26, 41}_0 ∧ true) 
c  in CNF:
c    -b^{26, 41}_2 ∨  b^{26, 41}_1 ∨  b^{26, 41}_0 ∨ false 
c  in DIMACS:
-14621  14622  14623  0

c  3 does not represent an automaton state.
c    -(-b^{26, 41}_2 ∧  b^{26, 41}_1 ∧  b^{26, 41}_0 ∧ true) 
c  in CNF:
c     b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ false 
c  in DIMACS:
 14621 -14622 -14623  0
c  -3 does not represent an automaton state.
c    -( b^{26, 41}_2 ∧  b^{26, 41}_1 ∧  b^{26, 41}_0 ∧ true) 
c  in CNF:
c    -b^{26, 41}_2 ∨ -b^{26, 41}_1 ∨ -b^{26, 41}_0 ∨ false 
c  in DIMACS:
-14621 -14622 -14623  0

c i = 42
c  -2+1 --> -1
c    ( b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧  p_1092) -> ( b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0)
c  in CNF:
c    -b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨  b^{26, 43}_2
c    -b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_1
c    -b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨  b^{26, 43}_0
c  in DIMACS:
-14624 -14625  14626 -1092  14627 0
-14624 -14625  14626 -1092 -14628 0
-14624 -14625  14626 -1092  14629 0

c  -1+1 --> 0
c    ( b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0 ∧  p_1092) -> (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧ -b^{26, 43}_0)
c  in CNF:
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_2
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_1
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_0
c  in DIMACS:
-14624  14625 -14626 -1092 -14627 0
-14624  14625 -14626 -1092 -14628 0
-14624  14625 -14626 -1092 -14629 0

c  0+1 --> 1
c    (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧  p_1092) -> (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0)
c  in CNF:
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_2
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_1
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨  b^{26, 43}_0
c  in DIMACS:
 14624  14625  14626 -1092 -14627 0
 14624  14625  14626 -1092 -14628 0
 14624  14625  14626 -1092  14629 0

c  1+1 --> 2
c    (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0 ∧  p_1092) -> (-b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0)
c  in CNF:
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_2
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨  b^{26, 43}_1
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ -p_1092 ∨ -b^{26, 43}_0
c  in DIMACS:
 14624  14625 -14626 -1092 -14627 0
 14624  14625 -14626 -1092  14628 0
 14624  14625 -14626 -1092 -14629 0

c  2+1 --> break 
c    (-b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 14624 -14625  14626 -1092 1162 0


c  2-1 --> 1
c    (-b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧ -p_1092) -> (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0)
c  in CNF:
c     b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_2
c     b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_1
c     b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨  b^{26, 43}_0
c  in DIMACS:
 14624 -14625  14626  1092 -14627 0
 14624 -14625  14626  1092 -14628 0
 14624 -14625  14626  1092  14629 0

c  1-1 --> 0
c    (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0 ∧ -p_1092) -> (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧ -b^{26, 43}_0)
c  in CNF:
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_2
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_1
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_0
c  in DIMACS:
 14624  14625 -14626  1092 -14627 0
 14624  14625 -14626  1092 -14628 0
 14624  14625 -14626  1092 -14629 0

c  0-1 --> -1
c    (-b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧ -p_1092) -> ( b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0)
c  in CNF:
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨  b^{26, 43}_2
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_1
c     b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨  b^{26, 43}_0
c  in DIMACS:
 14624  14625  14626  1092  14627 0
 14624  14625  14626  1092 -14628 0
 14624  14625  14626  1092  14629 0

c  -1-1 --> -2
c    ( b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧  b^{26, 42}_0 ∧ -p_1092) -> ( b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0)
c  in CNF:
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨  b^{26, 43}_2
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨  b^{26, 43}_1
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨  p_1092 ∨ -b^{26, 43}_0
c  in DIMACS:
-14624  14625 -14626  1092  14627 0
-14624  14625 -14626  1092  14628 0
-14624  14625 -14626  1092 -14629 0

c  -2-1 --> break 
c    ( b^{26, 42}_2 ∧  b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨  b^{26, 42}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-14624 -14625  14626  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 42}_2 ∧ -b^{26, 42}_1 ∧ -b^{26, 42}_0 ∧ true) 
c  in CNF:
c    -b^{26, 42}_2 ∨  b^{26, 42}_1 ∨  b^{26, 42}_0 ∨ false 
c  in DIMACS:
-14624  14625  14626  0

c  3 does not represent an automaton state.
c    -(-b^{26, 42}_2 ∧  b^{26, 42}_1 ∧  b^{26, 42}_0 ∧ true) 
c  in CNF:
c     b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ false 
c  in DIMACS:
 14624 -14625 -14626  0
c  -3 does not represent an automaton state.
c    -( b^{26, 42}_2 ∧  b^{26, 42}_1 ∧  b^{26, 42}_0 ∧ true) 
c  in CNF:
c    -b^{26, 42}_2 ∨ -b^{26, 42}_1 ∨ -b^{26, 42}_0 ∨ false 
c  in DIMACS:
-14624 -14625 -14626  0

c i = 43
c  -2+1 --> -1
c    ( b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧  p_1118) -> ( b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0)
c  in CNF:
c    -b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨  b^{26, 44}_2
c    -b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_1
c    -b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨  b^{26, 44}_0
c  in DIMACS:
-14627 -14628  14629 -1118  14630 0
-14627 -14628  14629 -1118 -14631 0
-14627 -14628  14629 -1118  14632 0

c  -1+1 --> 0
c    ( b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0 ∧  p_1118) -> (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧ -b^{26, 44}_0)
c  in CNF:
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_2
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_1
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_0
c  in DIMACS:
-14627  14628 -14629 -1118 -14630 0
-14627  14628 -14629 -1118 -14631 0
-14627  14628 -14629 -1118 -14632 0

c  0+1 --> 1
c    (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧  p_1118) -> (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0)
c  in CNF:
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_2
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_1
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨  b^{26, 44}_0
c  in DIMACS:
 14627  14628  14629 -1118 -14630 0
 14627  14628  14629 -1118 -14631 0
 14627  14628  14629 -1118  14632 0

c  1+1 --> 2
c    (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0 ∧  p_1118) -> (-b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0)
c  in CNF:
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_2
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨  b^{26, 44}_1
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ -p_1118 ∨ -b^{26, 44}_0
c  in DIMACS:
 14627  14628 -14629 -1118 -14630 0
 14627  14628 -14629 -1118  14631 0
 14627  14628 -14629 -1118 -14632 0

c  2+1 --> break 
c    (-b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 14627 -14628  14629 -1118 1162 0


c  2-1 --> 1
c    (-b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧ -p_1118) -> (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0)
c  in CNF:
c     b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_2
c     b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_1
c     b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨  b^{26, 44}_0
c  in DIMACS:
 14627 -14628  14629  1118 -14630 0
 14627 -14628  14629  1118 -14631 0
 14627 -14628  14629  1118  14632 0

c  1-1 --> 0
c    (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0 ∧ -p_1118) -> (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧ -b^{26, 44}_0)
c  in CNF:
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_2
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_1
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_0
c  in DIMACS:
 14627  14628 -14629  1118 -14630 0
 14627  14628 -14629  1118 -14631 0
 14627  14628 -14629  1118 -14632 0

c  0-1 --> -1
c    (-b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧ -p_1118) -> ( b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0)
c  in CNF:
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨  b^{26, 44}_2
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_1
c     b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨  b^{26, 44}_0
c  in DIMACS:
 14627  14628  14629  1118  14630 0
 14627  14628  14629  1118 -14631 0
 14627  14628  14629  1118  14632 0

c  -1-1 --> -2
c    ( b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧  b^{26, 43}_0 ∧ -p_1118) -> ( b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0)
c  in CNF:
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨  b^{26, 44}_2
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨  b^{26, 44}_1
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨  p_1118 ∨ -b^{26, 44}_0
c  in DIMACS:
-14627  14628 -14629  1118  14630 0
-14627  14628 -14629  1118  14631 0
-14627  14628 -14629  1118 -14632 0

c  -2-1 --> break 
c    ( b^{26, 43}_2 ∧  b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨  b^{26, 43}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-14627 -14628  14629  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 43}_2 ∧ -b^{26, 43}_1 ∧ -b^{26, 43}_0 ∧ true) 
c  in CNF:
c    -b^{26, 43}_2 ∨  b^{26, 43}_1 ∨  b^{26, 43}_0 ∨ false 
c  in DIMACS:
-14627  14628  14629  0

c  3 does not represent an automaton state.
c    -(-b^{26, 43}_2 ∧  b^{26, 43}_1 ∧  b^{26, 43}_0 ∧ true) 
c  in CNF:
c     b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ false 
c  in DIMACS:
 14627 -14628 -14629  0
c  -3 does not represent an automaton state.
c    -( b^{26, 43}_2 ∧  b^{26, 43}_1 ∧  b^{26, 43}_0 ∧ true) 
c  in CNF:
c    -b^{26, 43}_2 ∨ -b^{26, 43}_1 ∨ -b^{26, 43}_0 ∨ false 
c  in DIMACS:
-14627 -14628 -14629  0

c i = 44
c  -2+1 --> -1
c    ( b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧  p_1144) -> ( b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧  b^{26, 45}_0)
c  in CNF:
c    -b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨  b^{26, 45}_2
c    -b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_1
c    -b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨  b^{26, 45}_0
c  in DIMACS:
-14630 -14631  14632 -1144  14633 0
-14630 -14631  14632 -1144 -14634 0
-14630 -14631  14632 -1144  14635 0

c  -1+1 --> 0
c    ( b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0 ∧  p_1144) -> (-b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧ -b^{26, 45}_0)
c  in CNF:
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_2
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_1
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_0
c  in DIMACS:
-14630  14631 -14632 -1144 -14633 0
-14630  14631 -14632 -1144 -14634 0
-14630  14631 -14632 -1144 -14635 0

c  0+1 --> 1
c    (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧  p_1144) -> (-b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧  b^{26, 45}_0)
c  in CNF:
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_2
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_1
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨  b^{26, 45}_0
c  in DIMACS:
 14630  14631  14632 -1144 -14633 0
 14630  14631  14632 -1144 -14634 0
 14630  14631  14632 -1144  14635 0

c  1+1 --> 2
c    (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0 ∧  p_1144) -> (-b^{26, 45}_2 ∧  b^{26, 45}_1 ∧ -b^{26, 45}_0)
c  in CNF:
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_2
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨  b^{26, 45}_1
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ -p_1144 ∨ -b^{26, 45}_0
c  in DIMACS:
 14630  14631 -14632 -1144 -14633 0
 14630  14631 -14632 -1144  14634 0
 14630  14631 -14632 -1144 -14635 0

c  2+1 --> break 
c    (-b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 14630 -14631  14632 -1144 1162 0


c  2-1 --> 1
c    (-b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧ -p_1144) -> (-b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧  b^{26, 45}_0)
c  in CNF:
c     b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_2
c     b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_1
c     b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨  b^{26, 45}_0
c  in DIMACS:
 14630 -14631  14632  1144 -14633 0
 14630 -14631  14632  1144 -14634 0
 14630 -14631  14632  1144  14635 0

c  1-1 --> 0
c    (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0 ∧ -p_1144) -> (-b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧ -b^{26, 45}_0)
c  in CNF:
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_2
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_1
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_0
c  in DIMACS:
 14630  14631 -14632  1144 -14633 0
 14630  14631 -14632  1144 -14634 0
 14630  14631 -14632  1144 -14635 0

c  0-1 --> -1
c    (-b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧ -p_1144) -> ( b^{26, 45}_2 ∧ -b^{26, 45}_1 ∧  b^{26, 45}_0)
c  in CNF:
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨  b^{26, 45}_2
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_1
c     b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨  b^{26, 45}_0
c  in DIMACS:
 14630  14631  14632  1144  14633 0
 14630  14631  14632  1144 -14634 0
 14630  14631  14632  1144  14635 0

c  -1-1 --> -2
c    ( b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧  b^{26, 44}_0 ∧ -p_1144) -> ( b^{26, 45}_2 ∧  b^{26, 45}_1 ∧ -b^{26, 45}_0)
c  in CNF:
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨  b^{26, 45}_2
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨  b^{26, 45}_1
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨  p_1144 ∨ -b^{26, 45}_0
c  in DIMACS:
-14630  14631 -14632  1144  14633 0
-14630  14631 -14632  1144  14634 0
-14630  14631 -14632  1144 -14635 0

c  -2-1 --> break 
c    ( b^{26, 44}_2 ∧  b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨  b^{26, 44}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-14630 -14631  14632  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{26, 44}_2 ∧ -b^{26, 44}_1 ∧ -b^{26, 44}_0 ∧ true) 
c  in CNF:
c    -b^{26, 44}_2 ∨  b^{26, 44}_1 ∨  b^{26, 44}_0 ∨ false 
c  in DIMACS:
-14630  14631  14632  0

c  3 does not represent an automaton state.
c    -(-b^{26, 44}_2 ∧  b^{26, 44}_1 ∧  b^{26, 44}_0 ∧ true) 
c  in CNF:
c     b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ false 
c  in DIMACS:
 14630 -14631 -14632  0
c  -3 does not represent an automaton state.
c    -( b^{26, 44}_2 ∧  b^{26, 44}_1 ∧  b^{26, 44}_0 ∧ true) 
c  in CNF:
c    -b^{26, 44}_2 ∨ -b^{26, 44}_1 ∨ -b^{26, 44}_0 ∨ false 
c  in DIMACS:
-14630 -14631 -14632  0

c INIT for k = 27
c    -b^{27, 1}_2
c    -b^{27, 1}_1
c    -b^{27, 1}_0
c  in DIMACS:
-14636 0
-14637 0
-14638 0

c Transitions for k = 27
c i = 1
c  -2+1 --> -1
c    ( b^{27, 1}_2 ∧  b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧  p_27) -> ( b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0)
c  in CNF:
c    -b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨  b^{27, 2}_2
c    -b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_1
c    -b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨  b^{27, 2}_0
c  in DIMACS:
-14636 -14637  14638 -27  14639 0
-14636 -14637  14638 -27 -14640 0
-14636 -14637  14638 -27  14641 0

c  -1+1 --> 0
c    ( b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧  b^{27, 1}_0 ∧  p_27) -> (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧ -b^{27, 2}_0)
c  in CNF:
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_2
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_1
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_0
c  in DIMACS:
-14636  14637 -14638 -27 -14639 0
-14636  14637 -14638 -27 -14640 0
-14636  14637 -14638 -27 -14641 0

c  0+1 --> 1
c    (-b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧  p_27) -> (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0)
c  in CNF:
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_2
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_1
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨  b^{27, 2}_0
c  in DIMACS:
 14636  14637  14638 -27 -14639 0
 14636  14637  14638 -27 -14640 0
 14636  14637  14638 -27  14641 0

c  1+1 --> 2
c    (-b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧  b^{27, 1}_0 ∧  p_27) -> (-b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0)
c  in CNF:
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_2
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨  b^{27, 2}_1
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ -p_27 ∨ -b^{27, 2}_0
c  in DIMACS:
 14636  14637 -14638 -27 -14639 0
 14636  14637 -14638 -27  14640 0
 14636  14637 -14638 -27 -14641 0

c  2+1 --> break 
c    (-b^{27, 1}_2 ∧  b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧  p_27) -> break
c  in CNF:
c     b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ -p_27 ∨ break
c  in DIMACS:
 14636 -14637  14638 -27 1162 0


c  2-1 --> 1
c    (-b^{27, 1}_2 ∧  b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧ -p_27) -> (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0)
c  in CNF:
c     b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_2
c     b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_1
c     b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨  b^{27, 2}_0
c  in DIMACS:
 14636 -14637  14638  27 -14639 0
 14636 -14637  14638  27 -14640 0
 14636 -14637  14638  27  14641 0

c  1-1 --> 0
c    (-b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧  b^{27, 1}_0 ∧ -p_27) -> (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧ -b^{27, 2}_0)
c  in CNF:
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_2
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_1
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_0
c  in DIMACS:
 14636  14637 -14638  27 -14639 0
 14636  14637 -14638  27 -14640 0
 14636  14637 -14638  27 -14641 0

c  0-1 --> -1
c    (-b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧ -p_27) -> ( b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0)
c  in CNF:
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨  b^{27, 2}_2
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_1
c     b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨  b^{27, 2}_0
c  in DIMACS:
 14636  14637  14638  27  14639 0
 14636  14637  14638  27 -14640 0
 14636  14637  14638  27  14641 0

c  -1-1 --> -2
c    ( b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧  b^{27, 1}_0 ∧ -p_27) -> ( b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0)
c  in CNF:
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨  b^{27, 2}_2
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨  b^{27, 2}_1
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨  p_27 ∨ -b^{27, 2}_0
c  in DIMACS:
-14636  14637 -14638  27  14639 0
-14636  14637 -14638  27  14640 0
-14636  14637 -14638  27 -14641 0

c  -2-1 --> break 
c    ( b^{27, 1}_2 ∧  b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧ -p_27) -> break
c  in CNF:
c    -b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨  b^{27, 1}_0 ∨  p_27 ∨ break
c  in DIMACS:
-14636 -14637  14638  27 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 1}_2 ∧ -b^{27, 1}_1 ∧ -b^{27, 1}_0 ∧ true) 
c  in CNF:
c    -b^{27, 1}_2 ∨  b^{27, 1}_1 ∨  b^{27, 1}_0 ∨ false 
c  in DIMACS:
-14636  14637  14638  0

c  3 does not represent an automaton state.
c    -(-b^{27, 1}_2 ∧  b^{27, 1}_1 ∧  b^{27, 1}_0 ∧ true) 
c  in CNF:
c     b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ false 
c  in DIMACS:
 14636 -14637 -14638  0
c  -3 does not represent an automaton state.
c    -( b^{27, 1}_2 ∧  b^{27, 1}_1 ∧  b^{27, 1}_0 ∧ true) 
c  in CNF:
c    -b^{27, 1}_2 ∨ -b^{27, 1}_1 ∨ -b^{27, 1}_0 ∨ false 
c  in DIMACS:
-14636 -14637 -14638  0

c i = 2
c  -2+1 --> -1
c    ( b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧  p_54) -> ( b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0)
c  in CNF:
c    -b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨  b^{27, 3}_2
c    -b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_1
c    -b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨  b^{27, 3}_0
c  in DIMACS:
-14639 -14640  14641 -54  14642 0
-14639 -14640  14641 -54 -14643 0
-14639 -14640  14641 -54  14644 0

c  -1+1 --> 0
c    ( b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0 ∧  p_54) -> (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧ -b^{27, 3}_0)
c  in CNF:
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_2
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_1
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_0
c  in DIMACS:
-14639  14640 -14641 -54 -14642 0
-14639  14640 -14641 -54 -14643 0
-14639  14640 -14641 -54 -14644 0

c  0+1 --> 1
c    (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧  p_54) -> (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0)
c  in CNF:
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_2
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_1
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨  b^{27, 3}_0
c  in DIMACS:
 14639  14640  14641 -54 -14642 0
 14639  14640  14641 -54 -14643 0
 14639  14640  14641 -54  14644 0

c  1+1 --> 2
c    (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0 ∧  p_54) -> (-b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0)
c  in CNF:
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_2
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨  b^{27, 3}_1
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ -p_54 ∨ -b^{27, 3}_0
c  in DIMACS:
 14639  14640 -14641 -54 -14642 0
 14639  14640 -14641 -54  14643 0
 14639  14640 -14641 -54 -14644 0

c  2+1 --> break 
c    (-b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧  p_54) -> break
c  in CNF:
c     b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 14639 -14640  14641 -54 1162 0


c  2-1 --> 1
c    (-b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧ -p_54) -> (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0)
c  in CNF:
c     b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_2
c     b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_1
c     b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨  b^{27, 3}_0
c  in DIMACS:
 14639 -14640  14641  54 -14642 0
 14639 -14640  14641  54 -14643 0
 14639 -14640  14641  54  14644 0

c  1-1 --> 0
c    (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0 ∧ -p_54) -> (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧ -b^{27, 3}_0)
c  in CNF:
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_2
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_1
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_0
c  in DIMACS:
 14639  14640 -14641  54 -14642 0
 14639  14640 -14641  54 -14643 0
 14639  14640 -14641  54 -14644 0

c  0-1 --> -1
c    (-b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧ -p_54) -> ( b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0)
c  in CNF:
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨  b^{27, 3}_2
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_1
c     b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨  b^{27, 3}_0
c  in DIMACS:
 14639  14640  14641  54  14642 0
 14639  14640  14641  54 -14643 0
 14639  14640  14641  54  14644 0

c  -1-1 --> -2
c    ( b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧  b^{27, 2}_0 ∧ -p_54) -> ( b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0)
c  in CNF:
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨  b^{27, 3}_2
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨  b^{27, 3}_1
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨  p_54 ∨ -b^{27, 3}_0
c  in DIMACS:
-14639  14640 -14641  54  14642 0
-14639  14640 -14641  54  14643 0
-14639  14640 -14641  54 -14644 0

c  -2-1 --> break 
c    ( b^{27, 2}_2 ∧  b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨  b^{27, 2}_0 ∨  p_54 ∨ break
c  in DIMACS:
-14639 -14640  14641  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 2}_2 ∧ -b^{27, 2}_1 ∧ -b^{27, 2}_0 ∧ true) 
c  in CNF:
c    -b^{27, 2}_2 ∨  b^{27, 2}_1 ∨  b^{27, 2}_0 ∨ false 
c  in DIMACS:
-14639  14640  14641  0

c  3 does not represent an automaton state.
c    -(-b^{27, 2}_2 ∧  b^{27, 2}_1 ∧  b^{27, 2}_0 ∧ true) 
c  in CNF:
c     b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ false 
c  in DIMACS:
 14639 -14640 -14641  0
c  -3 does not represent an automaton state.
c    -( b^{27, 2}_2 ∧  b^{27, 2}_1 ∧  b^{27, 2}_0 ∧ true) 
c  in CNF:
c    -b^{27, 2}_2 ∨ -b^{27, 2}_1 ∨ -b^{27, 2}_0 ∨ false 
c  in DIMACS:
-14639 -14640 -14641  0

c i = 3
c  -2+1 --> -1
c    ( b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧  p_81) -> ( b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0)
c  in CNF:
c    -b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨  b^{27, 4}_2
c    -b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_1
c    -b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨  b^{27, 4}_0
c  in DIMACS:
-14642 -14643  14644 -81  14645 0
-14642 -14643  14644 -81 -14646 0
-14642 -14643  14644 -81  14647 0

c  -1+1 --> 0
c    ( b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0 ∧  p_81) -> (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧ -b^{27, 4}_0)
c  in CNF:
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_2
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_1
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_0
c  in DIMACS:
-14642  14643 -14644 -81 -14645 0
-14642  14643 -14644 -81 -14646 0
-14642  14643 -14644 -81 -14647 0

c  0+1 --> 1
c    (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧  p_81) -> (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0)
c  in CNF:
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_2
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_1
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨  b^{27, 4}_0
c  in DIMACS:
 14642  14643  14644 -81 -14645 0
 14642  14643  14644 -81 -14646 0
 14642  14643  14644 -81  14647 0

c  1+1 --> 2
c    (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0 ∧  p_81) -> (-b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0)
c  in CNF:
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_2
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨  b^{27, 4}_1
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ -p_81 ∨ -b^{27, 4}_0
c  in DIMACS:
 14642  14643 -14644 -81 -14645 0
 14642  14643 -14644 -81  14646 0
 14642  14643 -14644 -81 -14647 0

c  2+1 --> break 
c    (-b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧  p_81) -> break
c  in CNF:
c     b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ -p_81 ∨ break
c  in DIMACS:
 14642 -14643  14644 -81 1162 0


c  2-1 --> 1
c    (-b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧ -p_81) -> (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0)
c  in CNF:
c     b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_2
c     b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_1
c     b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨  b^{27, 4}_0
c  in DIMACS:
 14642 -14643  14644  81 -14645 0
 14642 -14643  14644  81 -14646 0
 14642 -14643  14644  81  14647 0

c  1-1 --> 0
c    (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0 ∧ -p_81) -> (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧ -b^{27, 4}_0)
c  in CNF:
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_2
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_1
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_0
c  in DIMACS:
 14642  14643 -14644  81 -14645 0
 14642  14643 -14644  81 -14646 0
 14642  14643 -14644  81 -14647 0

c  0-1 --> -1
c    (-b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧ -p_81) -> ( b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0)
c  in CNF:
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨  b^{27, 4}_2
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_1
c     b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨  b^{27, 4}_0
c  in DIMACS:
 14642  14643  14644  81  14645 0
 14642  14643  14644  81 -14646 0
 14642  14643  14644  81  14647 0

c  -1-1 --> -2
c    ( b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧  b^{27, 3}_0 ∧ -p_81) -> ( b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0)
c  in CNF:
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨  b^{27, 4}_2
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨  b^{27, 4}_1
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨  p_81 ∨ -b^{27, 4}_0
c  in DIMACS:
-14642  14643 -14644  81  14645 0
-14642  14643 -14644  81  14646 0
-14642  14643 -14644  81 -14647 0

c  -2-1 --> break 
c    ( b^{27, 3}_2 ∧  b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧ -p_81) -> break
c  in CNF:
c    -b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨  b^{27, 3}_0 ∨  p_81 ∨ break
c  in DIMACS:
-14642 -14643  14644  81 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 3}_2 ∧ -b^{27, 3}_1 ∧ -b^{27, 3}_0 ∧ true) 
c  in CNF:
c    -b^{27, 3}_2 ∨  b^{27, 3}_1 ∨  b^{27, 3}_0 ∨ false 
c  in DIMACS:
-14642  14643  14644  0

c  3 does not represent an automaton state.
c    -(-b^{27, 3}_2 ∧  b^{27, 3}_1 ∧  b^{27, 3}_0 ∧ true) 
c  in CNF:
c     b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ false 
c  in DIMACS:
 14642 -14643 -14644  0
c  -3 does not represent an automaton state.
c    -( b^{27, 3}_2 ∧  b^{27, 3}_1 ∧  b^{27, 3}_0 ∧ true) 
c  in CNF:
c    -b^{27, 3}_2 ∨ -b^{27, 3}_1 ∨ -b^{27, 3}_0 ∨ false 
c  in DIMACS:
-14642 -14643 -14644  0

c i = 4
c  -2+1 --> -1
c    ( b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧  p_108) -> ( b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0)
c  in CNF:
c    -b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨  b^{27, 5}_2
c    -b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_1
c    -b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨  b^{27, 5}_0
c  in DIMACS:
-14645 -14646  14647 -108  14648 0
-14645 -14646  14647 -108 -14649 0
-14645 -14646  14647 -108  14650 0

c  -1+1 --> 0
c    ( b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0 ∧  p_108) -> (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧ -b^{27, 5}_0)
c  in CNF:
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_2
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_1
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_0
c  in DIMACS:
-14645  14646 -14647 -108 -14648 0
-14645  14646 -14647 -108 -14649 0
-14645  14646 -14647 -108 -14650 0

c  0+1 --> 1
c    (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧  p_108) -> (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0)
c  in CNF:
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_2
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_1
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨  b^{27, 5}_0
c  in DIMACS:
 14645  14646  14647 -108 -14648 0
 14645  14646  14647 -108 -14649 0
 14645  14646  14647 -108  14650 0

c  1+1 --> 2
c    (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0 ∧  p_108) -> (-b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0)
c  in CNF:
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_2
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨  b^{27, 5}_1
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ -p_108 ∨ -b^{27, 5}_0
c  in DIMACS:
 14645  14646 -14647 -108 -14648 0
 14645  14646 -14647 -108  14649 0
 14645  14646 -14647 -108 -14650 0

c  2+1 --> break 
c    (-b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧  p_108) -> break
c  in CNF:
c     b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 14645 -14646  14647 -108 1162 0


c  2-1 --> 1
c    (-b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧ -p_108) -> (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0)
c  in CNF:
c     b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_2
c     b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_1
c     b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨  b^{27, 5}_0
c  in DIMACS:
 14645 -14646  14647  108 -14648 0
 14645 -14646  14647  108 -14649 0
 14645 -14646  14647  108  14650 0

c  1-1 --> 0
c    (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0 ∧ -p_108) -> (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧ -b^{27, 5}_0)
c  in CNF:
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_2
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_1
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_0
c  in DIMACS:
 14645  14646 -14647  108 -14648 0
 14645  14646 -14647  108 -14649 0
 14645  14646 -14647  108 -14650 0

c  0-1 --> -1
c    (-b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧ -p_108) -> ( b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0)
c  in CNF:
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨  b^{27, 5}_2
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_1
c     b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨  b^{27, 5}_0
c  in DIMACS:
 14645  14646  14647  108  14648 0
 14645  14646  14647  108 -14649 0
 14645  14646  14647  108  14650 0

c  -1-1 --> -2
c    ( b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧  b^{27, 4}_0 ∧ -p_108) -> ( b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0)
c  in CNF:
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨  b^{27, 5}_2
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨  b^{27, 5}_1
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨  p_108 ∨ -b^{27, 5}_0
c  in DIMACS:
-14645  14646 -14647  108  14648 0
-14645  14646 -14647  108  14649 0
-14645  14646 -14647  108 -14650 0

c  -2-1 --> break 
c    ( b^{27, 4}_2 ∧  b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨  b^{27, 4}_0 ∨  p_108 ∨ break
c  in DIMACS:
-14645 -14646  14647  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 4}_2 ∧ -b^{27, 4}_1 ∧ -b^{27, 4}_0 ∧ true) 
c  in CNF:
c    -b^{27, 4}_2 ∨  b^{27, 4}_1 ∨  b^{27, 4}_0 ∨ false 
c  in DIMACS:
-14645  14646  14647  0

c  3 does not represent an automaton state.
c    -(-b^{27, 4}_2 ∧  b^{27, 4}_1 ∧  b^{27, 4}_0 ∧ true) 
c  in CNF:
c     b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ false 
c  in DIMACS:
 14645 -14646 -14647  0
c  -3 does not represent an automaton state.
c    -( b^{27, 4}_2 ∧  b^{27, 4}_1 ∧  b^{27, 4}_0 ∧ true) 
c  in CNF:
c    -b^{27, 4}_2 ∨ -b^{27, 4}_1 ∨ -b^{27, 4}_0 ∨ false 
c  in DIMACS:
-14645 -14646 -14647  0

c i = 5
c  -2+1 --> -1
c    ( b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧  p_135) -> ( b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0)
c  in CNF:
c    -b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨  b^{27, 6}_2
c    -b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_1
c    -b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨  b^{27, 6}_0
c  in DIMACS:
-14648 -14649  14650 -135  14651 0
-14648 -14649  14650 -135 -14652 0
-14648 -14649  14650 -135  14653 0

c  -1+1 --> 0
c    ( b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0 ∧  p_135) -> (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧ -b^{27, 6}_0)
c  in CNF:
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_2
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_1
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_0
c  in DIMACS:
-14648  14649 -14650 -135 -14651 0
-14648  14649 -14650 -135 -14652 0
-14648  14649 -14650 -135 -14653 0

c  0+1 --> 1
c    (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧  p_135) -> (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0)
c  in CNF:
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_2
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_1
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨  b^{27, 6}_0
c  in DIMACS:
 14648  14649  14650 -135 -14651 0
 14648  14649  14650 -135 -14652 0
 14648  14649  14650 -135  14653 0

c  1+1 --> 2
c    (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0 ∧  p_135) -> (-b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0)
c  in CNF:
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_2
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨  b^{27, 6}_1
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ -p_135 ∨ -b^{27, 6}_0
c  in DIMACS:
 14648  14649 -14650 -135 -14651 0
 14648  14649 -14650 -135  14652 0
 14648  14649 -14650 -135 -14653 0

c  2+1 --> break 
c    (-b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧  p_135) -> break
c  in CNF:
c     b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 14648 -14649  14650 -135 1162 0


c  2-1 --> 1
c    (-b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧ -p_135) -> (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0)
c  in CNF:
c     b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_2
c     b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_1
c     b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨  b^{27, 6}_0
c  in DIMACS:
 14648 -14649  14650  135 -14651 0
 14648 -14649  14650  135 -14652 0
 14648 -14649  14650  135  14653 0

c  1-1 --> 0
c    (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0 ∧ -p_135) -> (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧ -b^{27, 6}_0)
c  in CNF:
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_2
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_1
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_0
c  in DIMACS:
 14648  14649 -14650  135 -14651 0
 14648  14649 -14650  135 -14652 0
 14648  14649 -14650  135 -14653 0

c  0-1 --> -1
c    (-b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧ -p_135) -> ( b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0)
c  in CNF:
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨  b^{27, 6}_2
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_1
c     b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨  b^{27, 6}_0
c  in DIMACS:
 14648  14649  14650  135  14651 0
 14648  14649  14650  135 -14652 0
 14648  14649  14650  135  14653 0

c  -1-1 --> -2
c    ( b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧  b^{27, 5}_0 ∧ -p_135) -> ( b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0)
c  in CNF:
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨  b^{27, 6}_2
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨  b^{27, 6}_1
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨  p_135 ∨ -b^{27, 6}_0
c  in DIMACS:
-14648  14649 -14650  135  14651 0
-14648  14649 -14650  135  14652 0
-14648  14649 -14650  135 -14653 0

c  -2-1 --> break 
c    ( b^{27, 5}_2 ∧  b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨  b^{27, 5}_0 ∨  p_135 ∨ break
c  in DIMACS:
-14648 -14649  14650  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 5}_2 ∧ -b^{27, 5}_1 ∧ -b^{27, 5}_0 ∧ true) 
c  in CNF:
c    -b^{27, 5}_2 ∨  b^{27, 5}_1 ∨  b^{27, 5}_0 ∨ false 
c  in DIMACS:
-14648  14649  14650  0

c  3 does not represent an automaton state.
c    -(-b^{27, 5}_2 ∧  b^{27, 5}_1 ∧  b^{27, 5}_0 ∧ true) 
c  in CNF:
c     b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ false 
c  in DIMACS:
 14648 -14649 -14650  0
c  -3 does not represent an automaton state.
c    -( b^{27, 5}_2 ∧  b^{27, 5}_1 ∧  b^{27, 5}_0 ∧ true) 
c  in CNF:
c    -b^{27, 5}_2 ∨ -b^{27, 5}_1 ∨ -b^{27, 5}_0 ∨ false 
c  in DIMACS:
-14648 -14649 -14650  0

c i = 6
c  -2+1 --> -1
c    ( b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧  p_162) -> ( b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0)
c  in CNF:
c    -b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨  b^{27, 7}_2
c    -b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_1
c    -b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨  b^{27, 7}_0
c  in DIMACS:
-14651 -14652  14653 -162  14654 0
-14651 -14652  14653 -162 -14655 0
-14651 -14652  14653 -162  14656 0

c  -1+1 --> 0
c    ( b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0 ∧  p_162) -> (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧ -b^{27, 7}_0)
c  in CNF:
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_2
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_1
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_0
c  in DIMACS:
-14651  14652 -14653 -162 -14654 0
-14651  14652 -14653 -162 -14655 0
-14651  14652 -14653 -162 -14656 0

c  0+1 --> 1
c    (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧  p_162) -> (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0)
c  in CNF:
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_2
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_1
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨  b^{27, 7}_0
c  in DIMACS:
 14651  14652  14653 -162 -14654 0
 14651  14652  14653 -162 -14655 0
 14651  14652  14653 -162  14656 0

c  1+1 --> 2
c    (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0 ∧  p_162) -> (-b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0)
c  in CNF:
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_2
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨  b^{27, 7}_1
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ -p_162 ∨ -b^{27, 7}_0
c  in DIMACS:
 14651  14652 -14653 -162 -14654 0
 14651  14652 -14653 -162  14655 0
 14651  14652 -14653 -162 -14656 0

c  2+1 --> break 
c    (-b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧  p_162) -> break
c  in CNF:
c     b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 14651 -14652  14653 -162 1162 0


c  2-1 --> 1
c    (-b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧ -p_162) -> (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0)
c  in CNF:
c     b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_2
c     b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_1
c     b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨  b^{27, 7}_0
c  in DIMACS:
 14651 -14652  14653  162 -14654 0
 14651 -14652  14653  162 -14655 0
 14651 -14652  14653  162  14656 0

c  1-1 --> 0
c    (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0 ∧ -p_162) -> (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧ -b^{27, 7}_0)
c  in CNF:
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_2
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_1
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_0
c  in DIMACS:
 14651  14652 -14653  162 -14654 0
 14651  14652 -14653  162 -14655 0
 14651  14652 -14653  162 -14656 0

c  0-1 --> -1
c    (-b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧ -p_162) -> ( b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0)
c  in CNF:
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨  b^{27, 7}_2
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_1
c     b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨  b^{27, 7}_0
c  in DIMACS:
 14651  14652  14653  162  14654 0
 14651  14652  14653  162 -14655 0
 14651  14652  14653  162  14656 0

c  -1-1 --> -2
c    ( b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧  b^{27, 6}_0 ∧ -p_162) -> ( b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0)
c  in CNF:
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨  b^{27, 7}_2
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨  b^{27, 7}_1
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨  p_162 ∨ -b^{27, 7}_0
c  in DIMACS:
-14651  14652 -14653  162  14654 0
-14651  14652 -14653  162  14655 0
-14651  14652 -14653  162 -14656 0

c  -2-1 --> break 
c    ( b^{27, 6}_2 ∧  b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨  b^{27, 6}_0 ∨  p_162 ∨ break
c  in DIMACS:
-14651 -14652  14653  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 6}_2 ∧ -b^{27, 6}_1 ∧ -b^{27, 6}_0 ∧ true) 
c  in CNF:
c    -b^{27, 6}_2 ∨  b^{27, 6}_1 ∨  b^{27, 6}_0 ∨ false 
c  in DIMACS:
-14651  14652  14653  0

c  3 does not represent an automaton state.
c    -(-b^{27, 6}_2 ∧  b^{27, 6}_1 ∧  b^{27, 6}_0 ∧ true) 
c  in CNF:
c     b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ false 
c  in DIMACS:
 14651 -14652 -14653  0
c  -3 does not represent an automaton state.
c    -( b^{27, 6}_2 ∧  b^{27, 6}_1 ∧  b^{27, 6}_0 ∧ true) 
c  in CNF:
c    -b^{27, 6}_2 ∨ -b^{27, 6}_1 ∨ -b^{27, 6}_0 ∨ false 
c  in DIMACS:
-14651 -14652 -14653  0

c i = 7
c  -2+1 --> -1
c    ( b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧  p_189) -> ( b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0)
c  in CNF:
c    -b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨  b^{27, 8}_2
c    -b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_1
c    -b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨  b^{27, 8}_0
c  in DIMACS:
-14654 -14655  14656 -189  14657 0
-14654 -14655  14656 -189 -14658 0
-14654 -14655  14656 -189  14659 0

c  -1+1 --> 0
c    ( b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0 ∧  p_189) -> (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧ -b^{27, 8}_0)
c  in CNF:
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_2
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_1
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_0
c  in DIMACS:
-14654  14655 -14656 -189 -14657 0
-14654  14655 -14656 -189 -14658 0
-14654  14655 -14656 -189 -14659 0

c  0+1 --> 1
c    (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧  p_189) -> (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0)
c  in CNF:
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_2
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_1
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨  b^{27, 8}_0
c  in DIMACS:
 14654  14655  14656 -189 -14657 0
 14654  14655  14656 -189 -14658 0
 14654  14655  14656 -189  14659 0

c  1+1 --> 2
c    (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0 ∧  p_189) -> (-b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0)
c  in CNF:
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_2
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨  b^{27, 8}_1
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ -p_189 ∨ -b^{27, 8}_0
c  in DIMACS:
 14654  14655 -14656 -189 -14657 0
 14654  14655 -14656 -189  14658 0
 14654  14655 -14656 -189 -14659 0

c  2+1 --> break 
c    (-b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧  p_189) -> break
c  in CNF:
c     b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 14654 -14655  14656 -189 1162 0


c  2-1 --> 1
c    (-b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧ -p_189) -> (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0)
c  in CNF:
c     b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_2
c     b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_1
c     b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨  b^{27, 8}_0
c  in DIMACS:
 14654 -14655  14656  189 -14657 0
 14654 -14655  14656  189 -14658 0
 14654 -14655  14656  189  14659 0

c  1-1 --> 0
c    (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0 ∧ -p_189) -> (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧ -b^{27, 8}_0)
c  in CNF:
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_2
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_1
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_0
c  in DIMACS:
 14654  14655 -14656  189 -14657 0
 14654  14655 -14656  189 -14658 0
 14654  14655 -14656  189 -14659 0

c  0-1 --> -1
c    (-b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧ -p_189) -> ( b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0)
c  in CNF:
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨  b^{27, 8}_2
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_1
c     b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨  b^{27, 8}_0
c  in DIMACS:
 14654  14655  14656  189  14657 0
 14654  14655  14656  189 -14658 0
 14654  14655  14656  189  14659 0

c  -1-1 --> -2
c    ( b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧  b^{27, 7}_0 ∧ -p_189) -> ( b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0)
c  in CNF:
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨  b^{27, 8}_2
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨  b^{27, 8}_1
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨  p_189 ∨ -b^{27, 8}_0
c  in DIMACS:
-14654  14655 -14656  189  14657 0
-14654  14655 -14656  189  14658 0
-14654  14655 -14656  189 -14659 0

c  -2-1 --> break 
c    ( b^{27, 7}_2 ∧  b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨  b^{27, 7}_0 ∨  p_189 ∨ break
c  in DIMACS:
-14654 -14655  14656  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 7}_2 ∧ -b^{27, 7}_1 ∧ -b^{27, 7}_0 ∧ true) 
c  in CNF:
c    -b^{27, 7}_2 ∨  b^{27, 7}_1 ∨  b^{27, 7}_0 ∨ false 
c  in DIMACS:
-14654  14655  14656  0

c  3 does not represent an automaton state.
c    -(-b^{27, 7}_2 ∧  b^{27, 7}_1 ∧  b^{27, 7}_0 ∧ true) 
c  in CNF:
c     b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ false 
c  in DIMACS:
 14654 -14655 -14656  0
c  -3 does not represent an automaton state.
c    -( b^{27, 7}_2 ∧  b^{27, 7}_1 ∧  b^{27, 7}_0 ∧ true) 
c  in CNF:
c    -b^{27, 7}_2 ∨ -b^{27, 7}_1 ∨ -b^{27, 7}_0 ∨ false 
c  in DIMACS:
-14654 -14655 -14656  0

c i = 8
c  -2+1 --> -1
c    ( b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧  p_216) -> ( b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0)
c  in CNF:
c    -b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨  b^{27, 9}_2
c    -b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_1
c    -b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨  b^{27, 9}_0
c  in DIMACS:
-14657 -14658  14659 -216  14660 0
-14657 -14658  14659 -216 -14661 0
-14657 -14658  14659 -216  14662 0

c  -1+1 --> 0
c    ( b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0 ∧  p_216) -> (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧ -b^{27, 9}_0)
c  in CNF:
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_2
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_1
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_0
c  in DIMACS:
-14657  14658 -14659 -216 -14660 0
-14657  14658 -14659 -216 -14661 0
-14657  14658 -14659 -216 -14662 0

c  0+1 --> 1
c    (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧  p_216) -> (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0)
c  in CNF:
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_2
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_1
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨  b^{27, 9}_0
c  in DIMACS:
 14657  14658  14659 -216 -14660 0
 14657  14658  14659 -216 -14661 0
 14657  14658  14659 -216  14662 0

c  1+1 --> 2
c    (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0 ∧  p_216) -> (-b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0)
c  in CNF:
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_2
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨  b^{27, 9}_1
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ -p_216 ∨ -b^{27, 9}_0
c  in DIMACS:
 14657  14658 -14659 -216 -14660 0
 14657  14658 -14659 -216  14661 0
 14657  14658 -14659 -216 -14662 0

c  2+1 --> break 
c    (-b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧  p_216) -> break
c  in CNF:
c     b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 14657 -14658  14659 -216 1162 0


c  2-1 --> 1
c    (-b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧ -p_216) -> (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0)
c  in CNF:
c     b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_2
c     b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_1
c     b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨  b^{27, 9}_0
c  in DIMACS:
 14657 -14658  14659  216 -14660 0
 14657 -14658  14659  216 -14661 0
 14657 -14658  14659  216  14662 0

c  1-1 --> 0
c    (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0 ∧ -p_216) -> (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧ -b^{27, 9}_0)
c  in CNF:
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_2
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_1
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_0
c  in DIMACS:
 14657  14658 -14659  216 -14660 0
 14657  14658 -14659  216 -14661 0
 14657  14658 -14659  216 -14662 0

c  0-1 --> -1
c    (-b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧ -p_216) -> ( b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0)
c  in CNF:
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨  b^{27, 9}_2
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_1
c     b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨  b^{27, 9}_0
c  in DIMACS:
 14657  14658  14659  216  14660 0
 14657  14658  14659  216 -14661 0
 14657  14658  14659  216  14662 0

c  -1-1 --> -2
c    ( b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧  b^{27, 8}_0 ∧ -p_216) -> ( b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0)
c  in CNF:
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨  b^{27, 9}_2
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨  b^{27, 9}_1
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨  p_216 ∨ -b^{27, 9}_0
c  in DIMACS:
-14657  14658 -14659  216  14660 0
-14657  14658 -14659  216  14661 0
-14657  14658 -14659  216 -14662 0

c  -2-1 --> break 
c    ( b^{27, 8}_2 ∧  b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨  b^{27, 8}_0 ∨  p_216 ∨ break
c  in DIMACS:
-14657 -14658  14659  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 8}_2 ∧ -b^{27, 8}_1 ∧ -b^{27, 8}_0 ∧ true) 
c  in CNF:
c    -b^{27, 8}_2 ∨  b^{27, 8}_1 ∨  b^{27, 8}_0 ∨ false 
c  in DIMACS:
-14657  14658  14659  0

c  3 does not represent an automaton state.
c    -(-b^{27, 8}_2 ∧  b^{27, 8}_1 ∧  b^{27, 8}_0 ∧ true) 
c  in CNF:
c     b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ false 
c  in DIMACS:
 14657 -14658 -14659  0
c  -3 does not represent an automaton state.
c    -( b^{27, 8}_2 ∧  b^{27, 8}_1 ∧  b^{27, 8}_0 ∧ true) 
c  in CNF:
c    -b^{27, 8}_2 ∨ -b^{27, 8}_1 ∨ -b^{27, 8}_0 ∨ false 
c  in DIMACS:
-14657 -14658 -14659  0

c i = 9
c  -2+1 --> -1
c    ( b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧  p_243) -> ( b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0)
c  in CNF:
c    -b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨  b^{27, 10}_2
c    -b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_1
c    -b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨  b^{27, 10}_0
c  in DIMACS:
-14660 -14661  14662 -243  14663 0
-14660 -14661  14662 -243 -14664 0
-14660 -14661  14662 -243  14665 0

c  -1+1 --> 0
c    ( b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0 ∧  p_243) -> (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧ -b^{27, 10}_0)
c  in CNF:
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_2
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_1
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_0
c  in DIMACS:
-14660  14661 -14662 -243 -14663 0
-14660  14661 -14662 -243 -14664 0
-14660  14661 -14662 -243 -14665 0

c  0+1 --> 1
c    (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧  p_243) -> (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0)
c  in CNF:
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_2
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_1
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨  b^{27, 10}_0
c  in DIMACS:
 14660  14661  14662 -243 -14663 0
 14660  14661  14662 -243 -14664 0
 14660  14661  14662 -243  14665 0

c  1+1 --> 2
c    (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0 ∧  p_243) -> (-b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0)
c  in CNF:
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_2
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨  b^{27, 10}_1
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ -p_243 ∨ -b^{27, 10}_0
c  in DIMACS:
 14660  14661 -14662 -243 -14663 0
 14660  14661 -14662 -243  14664 0
 14660  14661 -14662 -243 -14665 0

c  2+1 --> break 
c    (-b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧  p_243) -> break
c  in CNF:
c     b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 14660 -14661  14662 -243 1162 0


c  2-1 --> 1
c    (-b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧ -p_243) -> (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0)
c  in CNF:
c     b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_2
c     b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_1
c     b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨  b^{27, 10}_0
c  in DIMACS:
 14660 -14661  14662  243 -14663 0
 14660 -14661  14662  243 -14664 0
 14660 -14661  14662  243  14665 0

c  1-1 --> 0
c    (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0 ∧ -p_243) -> (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧ -b^{27, 10}_0)
c  in CNF:
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_2
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_1
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_0
c  in DIMACS:
 14660  14661 -14662  243 -14663 0
 14660  14661 -14662  243 -14664 0
 14660  14661 -14662  243 -14665 0

c  0-1 --> -1
c    (-b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧ -p_243) -> ( b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0)
c  in CNF:
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨  b^{27, 10}_2
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_1
c     b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨  b^{27, 10}_0
c  in DIMACS:
 14660  14661  14662  243  14663 0
 14660  14661  14662  243 -14664 0
 14660  14661  14662  243  14665 0

c  -1-1 --> -2
c    ( b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧  b^{27, 9}_0 ∧ -p_243) -> ( b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0)
c  in CNF:
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨  b^{27, 10}_2
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨  b^{27, 10}_1
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨  p_243 ∨ -b^{27, 10}_0
c  in DIMACS:
-14660  14661 -14662  243  14663 0
-14660  14661 -14662  243  14664 0
-14660  14661 -14662  243 -14665 0

c  -2-1 --> break 
c    ( b^{27, 9}_2 ∧  b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨  b^{27, 9}_0 ∨  p_243 ∨ break
c  in DIMACS:
-14660 -14661  14662  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 9}_2 ∧ -b^{27, 9}_1 ∧ -b^{27, 9}_0 ∧ true) 
c  in CNF:
c    -b^{27, 9}_2 ∨  b^{27, 9}_1 ∨  b^{27, 9}_0 ∨ false 
c  in DIMACS:
-14660  14661  14662  0

c  3 does not represent an automaton state.
c    -(-b^{27, 9}_2 ∧  b^{27, 9}_1 ∧  b^{27, 9}_0 ∧ true) 
c  in CNF:
c     b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ false 
c  in DIMACS:
 14660 -14661 -14662  0
c  -3 does not represent an automaton state.
c    -( b^{27, 9}_2 ∧  b^{27, 9}_1 ∧  b^{27, 9}_0 ∧ true) 
c  in CNF:
c    -b^{27, 9}_2 ∨ -b^{27, 9}_1 ∨ -b^{27, 9}_0 ∨ false 
c  in DIMACS:
-14660 -14661 -14662  0

c i = 10
c  -2+1 --> -1
c    ( b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧  p_270) -> ( b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0)
c  in CNF:
c    -b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨  b^{27, 11}_2
c    -b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_1
c    -b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨  b^{27, 11}_0
c  in DIMACS:
-14663 -14664  14665 -270  14666 0
-14663 -14664  14665 -270 -14667 0
-14663 -14664  14665 -270  14668 0

c  -1+1 --> 0
c    ( b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0 ∧  p_270) -> (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧ -b^{27, 11}_0)
c  in CNF:
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_2
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_1
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_0
c  in DIMACS:
-14663  14664 -14665 -270 -14666 0
-14663  14664 -14665 -270 -14667 0
-14663  14664 -14665 -270 -14668 0

c  0+1 --> 1
c    (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧  p_270) -> (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0)
c  in CNF:
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_2
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_1
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨  b^{27, 11}_0
c  in DIMACS:
 14663  14664  14665 -270 -14666 0
 14663  14664  14665 -270 -14667 0
 14663  14664  14665 -270  14668 0

c  1+1 --> 2
c    (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0 ∧  p_270) -> (-b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0)
c  in CNF:
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_2
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨  b^{27, 11}_1
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ -p_270 ∨ -b^{27, 11}_0
c  in DIMACS:
 14663  14664 -14665 -270 -14666 0
 14663  14664 -14665 -270  14667 0
 14663  14664 -14665 -270 -14668 0

c  2+1 --> break 
c    (-b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧  p_270) -> break
c  in CNF:
c     b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 14663 -14664  14665 -270 1162 0


c  2-1 --> 1
c    (-b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧ -p_270) -> (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0)
c  in CNF:
c     b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_2
c     b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_1
c     b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨  b^{27, 11}_0
c  in DIMACS:
 14663 -14664  14665  270 -14666 0
 14663 -14664  14665  270 -14667 0
 14663 -14664  14665  270  14668 0

c  1-1 --> 0
c    (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0 ∧ -p_270) -> (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧ -b^{27, 11}_0)
c  in CNF:
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_2
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_1
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_0
c  in DIMACS:
 14663  14664 -14665  270 -14666 0
 14663  14664 -14665  270 -14667 0
 14663  14664 -14665  270 -14668 0

c  0-1 --> -1
c    (-b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧ -p_270) -> ( b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0)
c  in CNF:
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨  b^{27, 11}_2
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_1
c     b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨  b^{27, 11}_0
c  in DIMACS:
 14663  14664  14665  270  14666 0
 14663  14664  14665  270 -14667 0
 14663  14664  14665  270  14668 0

c  -1-1 --> -2
c    ( b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧  b^{27, 10}_0 ∧ -p_270) -> ( b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0)
c  in CNF:
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨  b^{27, 11}_2
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨  b^{27, 11}_1
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨  p_270 ∨ -b^{27, 11}_0
c  in DIMACS:
-14663  14664 -14665  270  14666 0
-14663  14664 -14665  270  14667 0
-14663  14664 -14665  270 -14668 0

c  -2-1 --> break 
c    ( b^{27, 10}_2 ∧  b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨  b^{27, 10}_0 ∨  p_270 ∨ break
c  in DIMACS:
-14663 -14664  14665  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 10}_2 ∧ -b^{27, 10}_1 ∧ -b^{27, 10}_0 ∧ true) 
c  in CNF:
c    -b^{27, 10}_2 ∨  b^{27, 10}_1 ∨  b^{27, 10}_0 ∨ false 
c  in DIMACS:
-14663  14664  14665  0

c  3 does not represent an automaton state.
c    -(-b^{27, 10}_2 ∧  b^{27, 10}_1 ∧  b^{27, 10}_0 ∧ true) 
c  in CNF:
c     b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ false 
c  in DIMACS:
 14663 -14664 -14665  0
c  -3 does not represent an automaton state.
c    -( b^{27, 10}_2 ∧  b^{27, 10}_1 ∧  b^{27, 10}_0 ∧ true) 
c  in CNF:
c    -b^{27, 10}_2 ∨ -b^{27, 10}_1 ∨ -b^{27, 10}_0 ∨ false 
c  in DIMACS:
-14663 -14664 -14665  0

c i = 11
c  -2+1 --> -1
c    ( b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧  p_297) -> ( b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0)
c  in CNF:
c    -b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨  b^{27, 12}_2
c    -b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_1
c    -b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨  b^{27, 12}_0
c  in DIMACS:
-14666 -14667  14668 -297  14669 0
-14666 -14667  14668 -297 -14670 0
-14666 -14667  14668 -297  14671 0

c  -1+1 --> 0
c    ( b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0 ∧  p_297) -> (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧ -b^{27, 12}_0)
c  in CNF:
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_2
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_1
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_0
c  in DIMACS:
-14666  14667 -14668 -297 -14669 0
-14666  14667 -14668 -297 -14670 0
-14666  14667 -14668 -297 -14671 0

c  0+1 --> 1
c    (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧  p_297) -> (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0)
c  in CNF:
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_2
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_1
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨  b^{27, 12}_0
c  in DIMACS:
 14666  14667  14668 -297 -14669 0
 14666  14667  14668 -297 -14670 0
 14666  14667  14668 -297  14671 0

c  1+1 --> 2
c    (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0 ∧  p_297) -> (-b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0)
c  in CNF:
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_2
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨  b^{27, 12}_1
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ -p_297 ∨ -b^{27, 12}_0
c  in DIMACS:
 14666  14667 -14668 -297 -14669 0
 14666  14667 -14668 -297  14670 0
 14666  14667 -14668 -297 -14671 0

c  2+1 --> break 
c    (-b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧  p_297) -> break
c  in CNF:
c     b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 14666 -14667  14668 -297 1162 0


c  2-1 --> 1
c    (-b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧ -p_297) -> (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0)
c  in CNF:
c     b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_2
c     b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_1
c     b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨  b^{27, 12}_0
c  in DIMACS:
 14666 -14667  14668  297 -14669 0
 14666 -14667  14668  297 -14670 0
 14666 -14667  14668  297  14671 0

c  1-1 --> 0
c    (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0 ∧ -p_297) -> (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧ -b^{27, 12}_0)
c  in CNF:
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_2
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_1
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_0
c  in DIMACS:
 14666  14667 -14668  297 -14669 0
 14666  14667 -14668  297 -14670 0
 14666  14667 -14668  297 -14671 0

c  0-1 --> -1
c    (-b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧ -p_297) -> ( b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0)
c  in CNF:
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨  b^{27, 12}_2
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_1
c     b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨  b^{27, 12}_0
c  in DIMACS:
 14666  14667  14668  297  14669 0
 14666  14667  14668  297 -14670 0
 14666  14667  14668  297  14671 0

c  -1-1 --> -2
c    ( b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧  b^{27, 11}_0 ∧ -p_297) -> ( b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0)
c  in CNF:
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨  b^{27, 12}_2
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨  b^{27, 12}_1
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨  p_297 ∨ -b^{27, 12}_0
c  in DIMACS:
-14666  14667 -14668  297  14669 0
-14666  14667 -14668  297  14670 0
-14666  14667 -14668  297 -14671 0

c  -2-1 --> break 
c    ( b^{27, 11}_2 ∧  b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨  b^{27, 11}_0 ∨  p_297 ∨ break
c  in DIMACS:
-14666 -14667  14668  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 11}_2 ∧ -b^{27, 11}_1 ∧ -b^{27, 11}_0 ∧ true) 
c  in CNF:
c    -b^{27, 11}_2 ∨  b^{27, 11}_1 ∨  b^{27, 11}_0 ∨ false 
c  in DIMACS:
-14666  14667  14668  0

c  3 does not represent an automaton state.
c    -(-b^{27, 11}_2 ∧  b^{27, 11}_1 ∧  b^{27, 11}_0 ∧ true) 
c  in CNF:
c     b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ false 
c  in DIMACS:
 14666 -14667 -14668  0
c  -3 does not represent an automaton state.
c    -( b^{27, 11}_2 ∧  b^{27, 11}_1 ∧  b^{27, 11}_0 ∧ true) 
c  in CNF:
c    -b^{27, 11}_2 ∨ -b^{27, 11}_1 ∨ -b^{27, 11}_0 ∨ false 
c  in DIMACS:
-14666 -14667 -14668  0

c i = 12
c  -2+1 --> -1
c    ( b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧  p_324) -> ( b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0)
c  in CNF:
c    -b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨  b^{27, 13}_2
c    -b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_1
c    -b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨  b^{27, 13}_0
c  in DIMACS:
-14669 -14670  14671 -324  14672 0
-14669 -14670  14671 -324 -14673 0
-14669 -14670  14671 -324  14674 0

c  -1+1 --> 0
c    ( b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0 ∧  p_324) -> (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧ -b^{27, 13}_0)
c  in CNF:
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_2
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_1
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_0
c  in DIMACS:
-14669  14670 -14671 -324 -14672 0
-14669  14670 -14671 -324 -14673 0
-14669  14670 -14671 -324 -14674 0

c  0+1 --> 1
c    (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧  p_324) -> (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0)
c  in CNF:
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_2
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_1
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨  b^{27, 13}_0
c  in DIMACS:
 14669  14670  14671 -324 -14672 0
 14669  14670  14671 -324 -14673 0
 14669  14670  14671 -324  14674 0

c  1+1 --> 2
c    (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0 ∧  p_324) -> (-b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0)
c  in CNF:
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_2
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨  b^{27, 13}_1
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ -p_324 ∨ -b^{27, 13}_0
c  in DIMACS:
 14669  14670 -14671 -324 -14672 0
 14669  14670 -14671 -324  14673 0
 14669  14670 -14671 -324 -14674 0

c  2+1 --> break 
c    (-b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧  p_324) -> break
c  in CNF:
c     b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 14669 -14670  14671 -324 1162 0


c  2-1 --> 1
c    (-b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧ -p_324) -> (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0)
c  in CNF:
c     b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_2
c     b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_1
c     b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨  b^{27, 13}_0
c  in DIMACS:
 14669 -14670  14671  324 -14672 0
 14669 -14670  14671  324 -14673 0
 14669 -14670  14671  324  14674 0

c  1-1 --> 0
c    (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0 ∧ -p_324) -> (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧ -b^{27, 13}_0)
c  in CNF:
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_2
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_1
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_0
c  in DIMACS:
 14669  14670 -14671  324 -14672 0
 14669  14670 -14671  324 -14673 0
 14669  14670 -14671  324 -14674 0

c  0-1 --> -1
c    (-b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧ -p_324) -> ( b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0)
c  in CNF:
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨  b^{27, 13}_2
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_1
c     b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨  b^{27, 13}_0
c  in DIMACS:
 14669  14670  14671  324  14672 0
 14669  14670  14671  324 -14673 0
 14669  14670  14671  324  14674 0

c  -1-1 --> -2
c    ( b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧  b^{27, 12}_0 ∧ -p_324) -> ( b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0)
c  in CNF:
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨  b^{27, 13}_2
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨  b^{27, 13}_1
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨  p_324 ∨ -b^{27, 13}_0
c  in DIMACS:
-14669  14670 -14671  324  14672 0
-14669  14670 -14671  324  14673 0
-14669  14670 -14671  324 -14674 0

c  -2-1 --> break 
c    ( b^{27, 12}_2 ∧  b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨  b^{27, 12}_0 ∨  p_324 ∨ break
c  in DIMACS:
-14669 -14670  14671  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 12}_2 ∧ -b^{27, 12}_1 ∧ -b^{27, 12}_0 ∧ true) 
c  in CNF:
c    -b^{27, 12}_2 ∨  b^{27, 12}_1 ∨  b^{27, 12}_0 ∨ false 
c  in DIMACS:
-14669  14670  14671  0

c  3 does not represent an automaton state.
c    -(-b^{27, 12}_2 ∧  b^{27, 12}_1 ∧  b^{27, 12}_0 ∧ true) 
c  in CNF:
c     b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ false 
c  in DIMACS:
 14669 -14670 -14671  0
c  -3 does not represent an automaton state.
c    -( b^{27, 12}_2 ∧  b^{27, 12}_1 ∧  b^{27, 12}_0 ∧ true) 
c  in CNF:
c    -b^{27, 12}_2 ∨ -b^{27, 12}_1 ∨ -b^{27, 12}_0 ∨ false 
c  in DIMACS:
-14669 -14670 -14671  0

c i = 13
c  -2+1 --> -1
c    ( b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧  p_351) -> ( b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0)
c  in CNF:
c    -b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨  b^{27, 14}_2
c    -b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_1
c    -b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨  b^{27, 14}_0
c  in DIMACS:
-14672 -14673  14674 -351  14675 0
-14672 -14673  14674 -351 -14676 0
-14672 -14673  14674 -351  14677 0

c  -1+1 --> 0
c    ( b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0 ∧  p_351) -> (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧ -b^{27, 14}_0)
c  in CNF:
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_2
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_1
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_0
c  in DIMACS:
-14672  14673 -14674 -351 -14675 0
-14672  14673 -14674 -351 -14676 0
-14672  14673 -14674 -351 -14677 0

c  0+1 --> 1
c    (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧  p_351) -> (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0)
c  in CNF:
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_2
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_1
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨  b^{27, 14}_0
c  in DIMACS:
 14672  14673  14674 -351 -14675 0
 14672  14673  14674 -351 -14676 0
 14672  14673  14674 -351  14677 0

c  1+1 --> 2
c    (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0 ∧  p_351) -> (-b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0)
c  in CNF:
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_2
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨  b^{27, 14}_1
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ -p_351 ∨ -b^{27, 14}_0
c  in DIMACS:
 14672  14673 -14674 -351 -14675 0
 14672  14673 -14674 -351  14676 0
 14672  14673 -14674 -351 -14677 0

c  2+1 --> break 
c    (-b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧  p_351) -> break
c  in CNF:
c     b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 14672 -14673  14674 -351 1162 0


c  2-1 --> 1
c    (-b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧ -p_351) -> (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0)
c  in CNF:
c     b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_2
c     b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_1
c     b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨  b^{27, 14}_0
c  in DIMACS:
 14672 -14673  14674  351 -14675 0
 14672 -14673  14674  351 -14676 0
 14672 -14673  14674  351  14677 0

c  1-1 --> 0
c    (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0 ∧ -p_351) -> (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧ -b^{27, 14}_0)
c  in CNF:
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_2
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_1
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_0
c  in DIMACS:
 14672  14673 -14674  351 -14675 0
 14672  14673 -14674  351 -14676 0
 14672  14673 -14674  351 -14677 0

c  0-1 --> -1
c    (-b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧ -p_351) -> ( b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0)
c  in CNF:
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨  b^{27, 14}_2
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_1
c     b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨  b^{27, 14}_0
c  in DIMACS:
 14672  14673  14674  351  14675 0
 14672  14673  14674  351 -14676 0
 14672  14673  14674  351  14677 0

c  -1-1 --> -2
c    ( b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧  b^{27, 13}_0 ∧ -p_351) -> ( b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0)
c  in CNF:
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨  b^{27, 14}_2
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨  b^{27, 14}_1
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨  p_351 ∨ -b^{27, 14}_0
c  in DIMACS:
-14672  14673 -14674  351  14675 0
-14672  14673 -14674  351  14676 0
-14672  14673 -14674  351 -14677 0

c  -2-1 --> break 
c    ( b^{27, 13}_2 ∧  b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨  b^{27, 13}_0 ∨  p_351 ∨ break
c  in DIMACS:
-14672 -14673  14674  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 13}_2 ∧ -b^{27, 13}_1 ∧ -b^{27, 13}_0 ∧ true) 
c  in CNF:
c    -b^{27, 13}_2 ∨  b^{27, 13}_1 ∨  b^{27, 13}_0 ∨ false 
c  in DIMACS:
-14672  14673  14674  0

c  3 does not represent an automaton state.
c    -(-b^{27, 13}_2 ∧  b^{27, 13}_1 ∧  b^{27, 13}_0 ∧ true) 
c  in CNF:
c     b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ false 
c  in DIMACS:
 14672 -14673 -14674  0
c  -3 does not represent an automaton state.
c    -( b^{27, 13}_2 ∧  b^{27, 13}_1 ∧  b^{27, 13}_0 ∧ true) 
c  in CNF:
c    -b^{27, 13}_2 ∨ -b^{27, 13}_1 ∨ -b^{27, 13}_0 ∨ false 
c  in DIMACS:
-14672 -14673 -14674  0

c i = 14
c  -2+1 --> -1
c    ( b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧  p_378) -> ( b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0)
c  in CNF:
c    -b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨  b^{27, 15}_2
c    -b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_1
c    -b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨  b^{27, 15}_0
c  in DIMACS:
-14675 -14676  14677 -378  14678 0
-14675 -14676  14677 -378 -14679 0
-14675 -14676  14677 -378  14680 0

c  -1+1 --> 0
c    ( b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0 ∧  p_378) -> (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧ -b^{27, 15}_0)
c  in CNF:
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_2
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_1
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_0
c  in DIMACS:
-14675  14676 -14677 -378 -14678 0
-14675  14676 -14677 -378 -14679 0
-14675  14676 -14677 -378 -14680 0

c  0+1 --> 1
c    (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧  p_378) -> (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0)
c  in CNF:
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_2
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_1
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨  b^{27, 15}_0
c  in DIMACS:
 14675  14676  14677 -378 -14678 0
 14675  14676  14677 -378 -14679 0
 14675  14676  14677 -378  14680 0

c  1+1 --> 2
c    (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0 ∧  p_378) -> (-b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0)
c  in CNF:
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_2
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨  b^{27, 15}_1
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ -p_378 ∨ -b^{27, 15}_0
c  in DIMACS:
 14675  14676 -14677 -378 -14678 0
 14675  14676 -14677 -378  14679 0
 14675  14676 -14677 -378 -14680 0

c  2+1 --> break 
c    (-b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧  p_378) -> break
c  in CNF:
c     b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 14675 -14676  14677 -378 1162 0


c  2-1 --> 1
c    (-b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧ -p_378) -> (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0)
c  in CNF:
c     b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_2
c     b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_1
c     b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨  b^{27, 15}_0
c  in DIMACS:
 14675 -14676  14677  378 -14678 0
 14675 -14676  14677  378 -14679 0
 14675 -14676  14677  378  14680 0

c  1-1 --> 0
c    (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0 ∧ -p_378) -> (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧ -b^{27, 15}_0)
c  in CNF:
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_2
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_1
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_0
c  in DIMACS:
 14675  14676 -14677  378 -14678 0
 14675  14676 -14677  378 -14679 0
 14675  14676 -14677  378 -14680 0

c  0-1 --> -1
c    (-b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧ -p_378) -> ( b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0)
c  in CNF:
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨  b^{27, 15}_2
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_1
c     b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨  b^{27, 15}_0
c  in DIMACS:
 14675  14676  14677  378  14678 0
 14675  14676  14677  378 -14679 0
 14675  14676  14677  378  14680 0

c  -1-1 --> -2
c    ( b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧  b^{27, 14}_0 ∧ -p_378) -> ( b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0)
c  in CNF:
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨  b^{27, 15}_2
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨  b^{27, 15}_1
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨  p_378 ∨ -b^{27, 15}_0
c  in DIMACS:
-14675  14676 -14677  378  14678 0
-14675  14676 -14677  378  14679 0
-14675  14676 -14677  378 -14680 0

c  -2-1 --> break 
c    ( b^{27, 14}_2 ∧  b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨  b^{27, 14}_0 ∨  p_378 ∨ break
c  in DIMACS:
-14675 -14676  14677  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 14}_2 ∧ -b^{27, 14}_1 ∧ -b^{27, 14}_0 ∧ true) 
c  in CNF:
c    -b^{27, 14}_2 ∨  b^{27, 14}_1 ∨  b^{27, 14}_0 ∨ false 
c  in DIMACS:
-14675  14676  14677  0

c  3 does not represent an automaton state.
c    -(-b^{27, 14}_2 ∧  b^{27, 14}_1 ∧  b^{27, 14}_0 ∧ true) 
c  in CNF:
c     b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ false 
c  in DIMACS:
 14675 -14676 -14677  0
c  -3 does not represent an automaton state.
c    -( b^{27, 14}_2 ∧  b^{27, 14}_1 ∧  b^{27, 14}_0 ∧ true) 
c  in CNF:
c    -b^{27, 14}_2 ∨ -b^{27, 14}_1 ∨ -b^{27, 14}_0 ∨ false 
c  in DIMACS:
-14675 -14676 -14677  0

c i = 15
c  -2+1 --> -1
c    ( b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧  p_405) -> ( b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0)
c  in CNF:
c    -b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨  b^{27, 16}_2
c    -b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_1
c    -b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨  b^{27, 16}_0
c  in DIMACS:
-14678 -14679  14680 -405  14681 0
-14678 -14679  14680 -405 -14682 0
-14678 -14679  14680 -405  14683 0

c  -1+1 --> 0
c    ( b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0 ∧  p_405) -> (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧ -b^{27, 16}_0)
c  in CNF:
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_2
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_1
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_0
c  in DIMACS:
-14678  14679 -14680 -405 -14681 0
-14678  14679 -14680 -405 -14682 0
-14678  14679 -14680 -405 -14683 0

c  0+1 --> 1
c    (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧  p_405) -> (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0)
c  in CNF:
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_2
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_1
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨  b^{27, 16}_0
c  in DIMACS:
 14678  14679  14680 -405 -14681 0
 14678  14679  14680 -405 -14682 0
 14678  14679  14680 -405  14683 0

c  1+1 --> 2
c    (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0 ∧  p_405) -> (-b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0)
c  in CNF:
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_2
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨  b^{27, 16}_1
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ -p_405 ∨ -b^{27, 16}_0
c  in DIMACS:
 14678  14679 -14680 -405 -14681 0
 14678  14679 -14680 -405  14682 0
 14678  14679 -14680 -405 -14683 0

c  2+1 --> break 
c    (-b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧  p_405) -> break
c  in CNF:
c     b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 14678 -14679  14680 -405 1162 0


c  2-1 --> 1
c    (-b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧ -p_405) -> (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0)
c  in CNF:
c     b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_2
c     b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_1
c     b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨  b^{27, 16}_0
c  in DIMACS:
 14678 -14679  14680  405 -14681 0
 14678 -14679  14680  405 -14682 0
 14678 -14679  14680  405  14683 0

c  1-1 --> 0
c    (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0 ∧ -p_405) -> (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧ -b^{27, 16}_0)
c  in CNF:
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_2
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_1
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_0
c  in DIMACS:
 14678  14679 -14680  405 -14681 0
 14678  14679 -14680  405 -14682 0
 14678  14679 -14680  405 -14683 0

c  0-1 --> -1
c    (-b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧ -p_405) -> ( b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0)
c  in CNF:
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨  b^{27, 16}_2
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_1
c     b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨  b^{27, 16}_0
c  in DIMACS:
 14678  14679  14680  405  14681 0
 14678  14679  14680  405 -14682 0
 14678  14679  14680  405  14683 0

c  -1-1 --> -2
c    ( b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧  b^{27, 15}_0 ∧ -p_405) -> ( b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0)
c  in CNF:
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨  b^{27, 16}_2
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨  b^{27, 16}_1
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨  p_405 ∨ -b^{27, 16}_0
c  in DIMACS:
-14678  14679 -14680  405  14681 0
-14678  14679 -14680  405  14682 0
-14678  14679 -14680  405 -14683 0

c  -2-1 --> break 
c    ( b^{27, 15}_2 ∧  b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨  b^{27, 15}_0 ∨  p_405 ∨ break
c  in DIMACS:
-14678 -14679  14680  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 15}_2 ∧ -b^{27, 15}_1 ∧ -b^{27, 15}_0 ∧ true) 
c  in CNF:
c    -b^{27, 15}_2 ∨  b^{27, 15}_1 ∨  b^{27, 15}_0 ∨ false 
c  in DIMACS:
-14678  14679  14680  0

c  3 does not represent an automaton state.
c    -(-b^{27, 15}_2 ∧  b^{27, 15}_1 ∧  b^{27, 15}_0 ∧ true) 
c  in CNF:
c     b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ false 
c  in DIMACS:
 14678 -14679 -14680  0
c  -3 does not represent an automaton state.
c    -( b^{27, 15}_2 ∧  b^{27, 15}_1 ∧  b^{27, 15}_0 ∧ true) 
c  in CNF:
c    -b^{27, 15}_2 ∨ -b^{27, 15}_1 ∨ -b^{27, 15}_0 ∨ false 
c  in DIMACS:
-14678 -14679 -14680  0

c i = 16
c  -2+1 --> -1
c    ( b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧  p_432) -> ( b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0)
c  in CNF:
c    -b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨  b^{27, 17}_2
c    -b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_1
c    -b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨  b^{27, 17}_0
c  in DIMACS:
-14681 -14682  14683 -432  14684 0
-14681 -14682  14683 -432 -14685 0
-14681 -14682  14683 -432  14686 0

c  -1+1 --> 0
c    ( b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0 ∧  p_432) -> (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧ -b^{27, 17}_0)
c  in CNF:
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_2
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_1
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_0
c  in DIMACS:
-14681  14682 -14683 -432 -14684 0
-14681  14682 -14683 -432 -14685 0
-14681  14682 -14683 -432 -14686 0

c  0+1 --> 1
c    (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧  p_432) -> (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0)
c  in CNF:
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_2
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_1
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨  b^{27, 17}_0
c  in DIMACS:
 14681  14682  14683 -432 -14684 0
 14681  14682  14683 -432 -14685 0
 14681  14682  14683 -432  14686 0

c  1+1 --> 2
c    (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0 ∧  p_432) -> (-b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0)
c  in CNF:
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_2
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨  b^{27, 17}_1
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ -p_432 ∨ -b^{27, 17}_0
c  in DIMACS:
 14681  14682 -14683 -432 -14684 0
 14681  14682 -14683 -432  14685 0
 14681  14682 -14683 -432 -14686 0

c  2+1 --> break 
c    (-b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧  p_432) -> break
c  in CNF:
c     b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 14681 -14682  14683 -432 1162 0


c  2-1 --> 1
c    (-b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧ -p_432) -> (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0)
c  in CNF:
c     b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_2
c     b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_1
c     b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨  b^{27, 17}_0
c  in DIMACS:
 14681 -14682  14683  432 -14684 0
 14681 -14682  14683  432 -14685 0
 14681 -14682  14683  432  14686 0

c  1-1 --> 0
c    (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0 ∧ -p_432) -> (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧ -b^{27, 17}_0)
c  in CNF:
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_2
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_1
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_0
c  in DIMACS:
 14681  14682 -14683  432 -14684 0
 14681  14682 -14683  432 -14685 0
 14681  14682 -14683  432 -14686 0

c  0-1 --> -1
c    (-b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧ -p_432) -> ( b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0)
c  in CNF:
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨  b^{27, 17}_2
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_1
c     b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨  b^{27, 17}_0
c  in DIMACS:
 14681  14682  14683  432  14684 0
 14681  14682  14683  432 -14685 0
 14681  14682  14683  432  14686 0

c  -1-1 --> -2
c    ( b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧  b^{27, 16}_0 ∧ -p_432) -> ( b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0)
c  in CNF:
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨  b^{27, 17}_2
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨  b^{27, 17}_1
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨  p_432 ∨ -b^{27, 17}_0
c  in DIMACS:
-14681  14682 -14683  432  14684 0
-14681  14682 -14683  432  14685 0
-14681  14682 -14683  432 -14686 0

c  -2-1 --> break 
c    ( b^{27, 16}_2 ∧  b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨  b^{27, 16}_0 ∨  p_432 ∨ break
c  in DIMACS:
-14681 -14682  14683  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 16}_2 ∧ -b^{27, 16}_1 ∧ -b^{27, 16}_0 ∧ true) 
c  in CNF:
c    -b^{27, 16}_2 ∨  b^{27, 16}_1 ∨  b^{27, 16}_0 ∨ false 
c  in DIMACS:
-14681  14682  14683  0

c  3 does not represent an automaton state.
c    -(-b^{27, 16}_2 ∧  b^{27, 16}_1 ∧  b^{27, 16}_0 ∧ true) 
c  in CNF:
c     b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ false 
c  in DIMACS:
 14681 -14682 -14683  0
c  -3 does not represent an automaton state.
c    -( b^{27, 16}_2 ∧  b^{27, 16}_1 ∧  b^{27, 16}_0 ∧ true) 
c  in CNF:
c    -b^{27, 16}_2 ∨ -b^{27, 16}_1 ∨ -b^{27, 16}_0 ∨ false 
c  in DIMACS:
-14681 -14682 -14683  0

c i = 17
c  -2+1 --> -1
c    ( b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧  p_459) -> ( b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0)
c  in CNF:
c    -b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨  b^{27, 18}_2
c    -b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_1
c    -b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨  b^{27, 18}_0
c  in DIMACS:
-14684 -14685  14686 -459  14687 0
-14684 -14685  14686 -459 -14688 0
-14684 -14685  14686 -459  14689 0

c  -1+1 --> 0
c    ( b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0 ∧  p_459) -> (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧ -b^{27, 18}_0)
c  in CNF:
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_2
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_1
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_0
c  in DIMACS:
-14684  14685 -14686 -459 -14687 0
-14684  14685 -14686 -459 -14688 0
-14684  14685 -14686 -459 -14689 0

c  0+1 --> 1
c    (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧  p_459) -> (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0)
c  in CNF:
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_2
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_1
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨  b^{27, 18}_0
c  in DIMACS:
 14684  14685  14686 -459 -14687 0
 14684  14685  14686 -459 -14688 0
 14684  14685  14686 -459  14689 0

c  1+1 --> 2
c    (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0 ∧  p_459) -> (-b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0)
c  in CNF:
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_2
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨  b^{27, 18}_1
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ -p_459 ∨ -b^{27, 18}_0
c  in DIMACS:
 14684  14685 -14686 -459 -14687 0
 14684  14685 -14686 -459  14688 0
 14684  14685 -14686 -459 -14689 0

c  2+1 --> break 
c    (-b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧  p_459) -> break
c  in CNF:
c     b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 14684 -14685  14686 -459 1162 0


c  2-1 --> 1
c    (-b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧ -p_459) -> (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0)
c  in CNF:
c     b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_2
c     b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_1
c     b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨  b^{27, 18}_0
c  in DIMACS:
 14684 -14685  14686  459 -14687 0
 14684 -14685  14686  459 -14688 0
 14684 -14685  14686  459  14689 0

c  1-1 --> 0
c    (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0 ∧ -p_459) -> (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧ -b^{27, 18}_0)
c  in CNF:
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_2
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_1
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_0
c  in DIMACS:
 14684  14685 -14686  459 -14687 0
 14684  14685 -14686  459 -14688 0
 14684  14685 -14686  459 -14689 0

c  0-1 --> -1
c    (-b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧ -p_459) -> ( b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0)
c  in CNF:
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨  b^{27, 18}_2
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_1
c     b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨  b^{27, 18}_0
c  in DIMACS:
 14684  14685  14686  459  14687 0
 14684  14685  14686  459 -14688 0
 14684  14685  14686  459  14689 0

c  -1-1 --> -2
c    ( b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧  b^{27, 17}_0 ∧ -p_459) -> ( b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0)
c  in CNF:
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨  b^{27, 18}_2
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨  b^{27, 18}_1
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨  p_459 ∨ -b^{27, 18}_0
c  in DIMACS:
-14684  14685 -14686  459  14687 0
-14684  14685 -14686  459  14688 0
-14684  14685 -14686  459 -14689 0

c  -2-1 --> break 
c    ( b^{27, 17}_2 ∧  b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨  b^{27, 17}_0 ∨  p_459 ∨ break
c  in DIMACS:
-14684 -14685  14686  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 17}_2 ∧ -b^{27, 17}_1 ∧ -b^{27, 17}_0 ∧ true) 
c  in CNF:
c    -b^{27, 17}_2 ∨  b^{27, 17}_1 ∨  b^{27, 17}_0 ∨ false 
c  in DIMACS:
-14684  14685  14686  0

c  3 does not represent an automaton state.
c    -(-b^{27, 17}_2 ∧  b^{27, 17}_1 ∧  b^{27, 17}_0 ∧ true) 
c  in CNF:
c     b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ false 
c  in DIMACS:
 14684 -14685 -14686  0
c  -3 does not represent an automaton state.
c    -( b^{27, 17}_2 ∧  b^{27, 17}_1 ∧  b^{27, 17}_0 ∧ true) 
c  in CNF:
c    -b^{27, 17}_2 ∨ -b^{27, 17}_1 ∨ -b^{27, 17}_0 ∨ false 
c  in DIMACS:
-14684 -14685 -14686  0

c i = 18
c  -2+1 --> -1
c    ( b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧  p_486) -> ( b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0)
c  in CNF:
c    -b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨  b^{27, 19}_2
c    -b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_1
c    -b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨  b^{27, 19}_0
c  in DIMACS:
-14687 -14688  14689 -486  14690 0
-14687 -14688  14689 -486 -14691 0
-14687 -14688  14689 -486  14692 0

c  -1+1 --> 0
c    ( b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0 ∧  p_486) -> (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧ -b^{27, 19}_0)
c  in CNF:
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_2
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_1
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_0
c  in DIMACS:
-14687  14688 -14689 -486 -14690 0
-14687  14688 -14689 -486 -14691 0
-14687  14688 -14689 -486 -14692 0

c  0+1 --> 1
c    (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧  p_486) -> (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0)
c  in CNF:
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_2
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_1
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨  b^{27, 19}_0
c  in DIMACS:
 14687  14688  14689 -486 -14690 0
 14687  14688  14689 -486 -14691 0
 14687  14688  14689 -486  14692 0

c  1+1 --> 2
c    (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0 ∧  p_486) -> (-b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0)
c  in CNF:
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_2
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨  b^{27, 19}_1
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ -p_486 ∨ -b^{27, 19}_0
c  in DIMACS:
 14687  14688 -14689 -486 -14690 0
 14687  14688 -14689 -486  14691 0
 14687  14688 -14689 -486 -14692 0

c  2+1 --> break 
c    (-b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧  p_486) -> break
c  in CNF:
c     b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 14687 -14688  14689 -486 1162 0


c  2-1 --> 1
c    (-b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧ -p_486) -> (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0)
c  in CNF:
c     b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_2
c     b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_1
c     b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨  b^{27, 19}_0
c  in DIMACS:
 14687 -14688  14689  486 -14690 0
 14687 -14688  14689  486 -14691 0
 14687 -14688  14689  486  14692 0

c  1-1 --> 0
c    (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0 ∧ -p_486) -> (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧ -b^{27, 19}_0)
c  in CNF:
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_2
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_1
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_0
c  in DIMACS:
 14687  14688 -14689  486 -14690 0
 14687  14688 -14689  486 -14691 0
 14687  14688 -14689  486 -14692 0

c  0-1 --> -1
c    (-b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧ -p_486) -> ( b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0)
c  in CNF:
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨  b^{27, 19}_2
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_1
c     b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨  b^{27, 19}_0
c  in DIMACS:
 14687  14688  14689  486  14690 0
 14687  14688  14689  486 -14691 0
 14687  14688  14689  486  14692 0

c  -1-1 --> -2
c    ( b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧  b^{27, 18}_0 ∧ -p_486) -> ( b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0)
c  in CNF:
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨  b^{27, 19}_2
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨  b^{27, 19}_1
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨  p_486 ∨ -b^{27, 19}_0
c  in DIMACS:
-14687  14688 -14689  486  14690 0
-14687  14688 -14689  486  14691 0
-14687  14688 -14689  486 -14692 0

c  -2-1 --> break 
c    ( b^{27, 18}_2 ∧  b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨  b^{27, 18}_0 ∨  p_486 ∨ break
c  in DIMACS:
-14687 -14688  14689  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 18}_2 ∧ -b^{27, 18}_1 ∧ -b^{27, 18}_0 ∧ true) 
c  in CNF:
c    -b^{27, 18}_2 ∨  b^{27, 18}_1 ∨  b^{27, 18}_0 ∨ false 
c  in DIMACS:
-14687  14688  14689  0

c  3 does not represent an automaton state.
c    -(-b^{27, 18}_2 ∧  b^{27, 18}_1 ∧  b^{27, 18}_0 ∧ true) 
c  in CNF:
c     b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ false 
c  in DIMACS:
 14687 -14688 -14689  0
c  -3 does not represent an automaton state.
c    -( b^{27, 18}_2 ∧  b^{27, 18}_1 ∧  b^{27, 18}_0 ∧ true) 
c  in CNF:
c    -b^{27, 18}_2 ∨ -b^{27, 18}_1 ∨ -b^{27, 18}_0 ∨ false 
c  in DIMACS:
-14687 -14688 -14689  0

c i = 19
c  -2+1 --> -1
c    ( b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧  p_513) -> ( b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0)
c  in CNF:
c    -b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨  b^{27, 20}_2
c    -b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_1
c    -b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨  b^{27, 20}_0
c  in DIMACS:
-14690 -14691  14692 -513  14693 0
-14690 -14691  14692 -513 -14694 0
-14690 -14691  14692 -513  14695 0

c  -1+1 --> 0
c    ( b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0 ∧  p_513) -> (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧ -b^{27, 20}_0)
c  in CNF:
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_2
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_1
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_0
c  in DIMACS:
-14690  14691 -14692 -513 -14693 0
-14690  14691 -14692 -513 -14694 0
-14690  14691 -14692 -513 -14695 0

c  0+1 --> 1
c    (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧  p_513) -> (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0)
c  in CNF:
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_2
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_1
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨  b^{27, 20}_0
c  in DIMACS:
 14690  14691  14692 -513 -14693 0
 14690  14691  14692 -513 -14694 0
 14690  14691  14692 -513  14695 0

c  1+1 --> 2
c    (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0 ∧  p_513) -> (-b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0)
c  in CNF:
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_2
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨  b^{27, 20}_1
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ -p_513 ∨ -b^{27, 20}_0
c  in DIMACS:
 14690  14691 -14692 -513 -14693 0
 14690  14691 -14692 -513  14694 0
 14690  14691 -14692 -513 -14695 0

c  2+1 --> break 
c    (-b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧  p_513) -> break
c  in CNF:
c     b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 14690 -14691  14692 -513 1162 0


c  2-1 --> 1
c    (-b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧ -p_513) -> (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0)
c  in CNF:
c     b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_2
c     b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_1
c     b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨  b^{27, 20}_0
c  in DIMACS:
 14690 -14691  14692  513 -14693 0
 14690 -14691  14692  513 -14694 0
 14690 -14691  14692  513  14695 0

c  1-1 --> 0
c    (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0 ∧ -p_513) -> (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧ -b^{27, 20}_0)
c  in CNF:
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_2
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_1
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_0
c  in DIMACS:
 14690  14691 -14692  513 -14693 0
 14690  14691 -14692  513 -14694 0
 14690  14691 -14692  513 -14695 0

c  0-1 --> -1
c    (-b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧ -p_513) -> ( b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0)
c  in CNF:
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨  b^{27, 20}_2
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_1
c     b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨  b^{27, 20}_0
c  in DIMACS:
 14690  14691  14692  513  14693 0
 14690  14691  14692  513 -14694 0
 14690  14691  14692  513  14695 0

c  -1-1 --> -2
c    ( b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧  b^{27, 19}_0 ∧ -p_513) -> ( b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0)
c  in CNF:
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨  b^{27, 20}_2
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨  b^{27, 20}_1
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨  p_513 ∨ -b^{27, 20}_0
c  in DIMACS:
-14690  14691 -14692  513  14693 0
-14690  14691 -14692  513  14694 0
-14690  14691 -14692  513 -14695 0

c  -2-1 --> break 
c    ( b^{27, 19}_2 ∧  b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨  b^{27, 19}_0 ∨  p_513 ∨ break
c  in DIMACS:
-14690 -14691  14692  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 19}_2 ∧ -b^{27, 19}_1 ∧ -b^{27, 19}_0 ∧ true) 
c  in CNF:
c    -b^{27, 19}_2 ∨  b^{27, 19}_1 ∨  b^{27, 19}_0 ∨ false 
c  in DIMACS:
-14690  14691  14692  0

c  3 does not represent an automaton state.
c    -(-b^{27, 19}_2 ∧  b^{27, 19}_1 ∧  b^{27, 19}_0 ∧ true) 
c  in CNF:
c     b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ false 
c  in DIMACS:
 14690 -14691 -14692  0
c  -3 does not represent an automaton state.
c    -( b^{27, 19}_2 ∧  b^{27, 19}_1 ∧  b^{27, 19}_0 ∧ true) 
c  in CNF:
c    -b^{27, 19}_2 ∨ -b^{27, 19}_1 ∨ -b^{27, 19}_0 ∨ false 
c  in DIMACS:
-14690 -14691 -14692  0

c i = 20
c  -2+1 --> -1
c    ( b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧  p_540) -> ( b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0)
c  in CNF:
c    -b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨  b^{27, 21}_2
c    -b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_1
c    -b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨  b^{27, 21}_0
c  in DIMACS:
-14693 -14694  14695 -540  14696 0
-14693 -14694  14695 -540 -14697 0
-14693 -14694  14695 -540  14698 0

c  -1+1 --> 0
c    ( b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0 ∧  p_540) -> (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧ -b^{27, 21}_0)
c  in CNF:
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_2
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_1
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_0
c  in DIMACS:
-14693  14694 -14695 -540 -14696 0
-14693  14694 -14695 -540 -14697 0
-14693  14694 -14695 -540 -14698 0

c  0+1 --> 1
c    (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧  p_540) -> (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0)
c  in CNF:
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_2
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_1
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨  b^{27, 21}_0
c  in DIMACS:
 14693  14694  14695 -540 -14696 0
 14693  14694  14695 -540 -14697 0
 14693  14694  14695 -540  14698 0

c  1+1 --> 2
c    (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0 ∧  p_540) -> (-b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0)
c  in CNF:
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_2
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨  b^{27, 21}_1
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ -p_540 ∨ -b^{27, 21}_0
c  in DIMACS:
 14693  14694 -14695 -540 -14696 0
 14693  14694 -14695 -540  14697 0
 14693  14694 -14695 -540 -14698 0

c  2+1 --> break 
c    (-b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧  p_540) -> break
c  in CNF:
c     b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 14693 -14694  14695 -540 1162 0


c  2-1 --> 1
c    (-b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧ -p_540) -> (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0)
c  in CNF:
c     b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_2
c     b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_1
c     b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨  b^{27, 21}_0
c  in DIMACS:
 14693 -14694  14695  540 -14696 0
 14693 -14694  14695  540 -14697 0
 14693 -14694  14695  540  14698 0

c  1-1 --> 0
c    (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0 ∧ -p_540) -> (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧ -b^{27, 21}_0)
c  in CNF:
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_2
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_1
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_0
c  in DIMACS:
 14693  14694 -14695  540 -14696 0
 14693  14694 -14695  540 -14697 0
 14693  14694 -14695  540 -14698 0

c  0-1 --> -1
c    (-b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧ -p_540) -> ( b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0)
c  in CNF:
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨  b^{27, 21}_2
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_1
c     b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨  b^{27, 21}_0
c  in DIMACS:
 14693  14694  14695  540  14696 0
 14693  14694  14695  540 -14697 0
 14693  14694  14695  540  14698 0

c  -1-1 --> -2
c    ( b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧  b^{27, 20}_0 ∧ -p_540) -> ( b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0)
c  in CNF:
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨  b^{27, 21}_2
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨  b^{27, 21}_1
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨  p_540 ∨ -b^{27, 21}_0
c  in DIMACS:
-14693  14694 -14695  540  14696 0
-14693  14694 -14695  540  14697 0
-14693  14694 -14695  540 -14698 0

c  -2-1 --> break 
c    ( b^{27, 20}_2 ∧  b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨  b^{27, 20}_0 ∨  p_540 ∨ break
c  in DIMACS:
-14693 -14694  14695  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 20}_2 ∧ -b^{27, 20}_1 ∧ -b^{27, 20}_0 ∧ true) 
c  in CNF:
c    -b^{27, 20}_2 ∨  b^{27, 20}_1 ∨  b^{27, 20}_0 ∨ false 
c  in DIMACS:
-14693  14694  14695  0

c  3 does not represent an automaton state.
c    -(-b^{27, 20}_2 ∧  b^{27, 20}_1 ∧  b^{27, 20}_0 ∧ true) 
c  in CNF:
c     b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ false 
c  in DIMACS:
 14693 -14694 -14695  0
c  -3 does not represent an automaton state.
c    -( b^{27, 20}_2 ∧  b^{27, 20}_1 ∧  b^{27, 20}_0 ∧ true) 
c  in CNF:
c    -b^{27, 20}_2 ∨ -b^{27, 20}_1 ∨ -b^{27, 20}_0 ∨ false 
c  in DIMACS:
-14693 -14694 -14695  0

c i = 21
c  -2+1 --> -1
c    ( b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧  p_567) -> ( b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0)
c  in CNF:
c    -b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨  b^{27, 22}_2
c    -b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_1
c    -b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨  b^{27, 22}_0
c  in DIMACS:
-14696 -14697  14698 -567  14699 0
-14696 -14697  14698 -567 -14700 0
-14696 -14697  14698 -567  14701 0

c  -1+1 --> 0
c    ( b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0 ∧  p_567) -> (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧ -b^{27, 22}_0)
c  in CNF:
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_2
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_1
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_0
c  in DIMACS:
-14696  14697 -14698 -567 -14699 0
-14696  14697 -14698 -567 -14700 0
-14696  14697 -14698 -567 -14701 0

c  0+1 --> 1
c    (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧  p_567) -> (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0)
c  in CNF:
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_2
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_1
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨  b^{27, 22}_0
c  in DIMACS:
 14696  14697  14698 -567 -14699 0
 14696  14697  14698 -567 -14700 0
 14696  14697  14698 -567  14701 0

c  1+1 --> 2
c    (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0 ∧  p_567) -> (-b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0)
c  in CNF:
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_2
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨  b^{27, 22}_1
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ -p_567 ∨ -b^{27, 22}_0
c  in DIMACS:
 14696  14697 -14698 -567 -14699 0
 14696  14697 -14698 -567  14700 0
 14696  14697 -14698 -567 -14701 0

c  2+1 --> break 
c    (-b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧  p_567) -> break
c  in CNF:
c     b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 14696 -14697  14698 -567 1162 0


c  2-1 --> 1
c    (-b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧ -p_567) -> (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0)
c  in CNF:
c     b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_2
c     b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_1
c     b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨  b^{27, 22}_0
c  in DIMACS:
 14696 -14697  14698  567 -14699 0
 14696 -14697  14698  567 -14700 0
 14696 -14697  14698  567  14701 0

c  1-1 --> 0
c    (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0 ∧ -p_567) -> (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧ -b^{27, 22}_0)
c  in CNF:
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_2
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_1
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_0
c  in DIMACS:
 14696  14697 -14698  567 -14699 0
 14696  14697 -14698  567 -14700 0
 14696  14697 -14698  567 -14701 0

c  0-1 --> -1
c    (-b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧ -p_567) -> ( b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0)
c  in CNF:
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨  b^{27, 22}_2
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_1
c     b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨  b^{27, 22}_0
c  in DIMACS:
 14696  14697  14698  567  14699 0
 14696  14697  14698  567 -14700 0
 14696  14697  14698  567  14701 0

c  -1-1 --> -2
c    ( b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧  b^{27, 21}_0 ∧ -p_567) -> ( b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0)
c  in CNF:
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨  b^{27, 22}_2
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨  b^{27, 22}_1
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨  p_567 ∨ -b^{27, 22}_0
c  in DIMACS:
-14696  14697 -14698  567  14699 0
-14696  14697 -14698  567  14700 0
-14696  14697 -14698  567 -14701 0

c  -2-1 --> break 
c    ( b^{27, 21}_2 ∧  b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨  b^{27, 21}_0 ∨  p_567 ∨ break
c  in DIMACS:
-14696 -14697  14698  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 21}_2 ∧ -b^{27, 21}_1 ∧ -b^{27, 21}_0 ∧ true) 
c  in CNF:
c    -b^{27, 21}_2 ∨  b^{27, 21}_1 ∨  b^{27, 21}_0 ∨ false 
c  in DIMACS:
-14696  14697  14698  0

c  3 does not represent an automaton state.
c    -(-b^{27, 21}_2 ∧  b^{27, 21}_1 ∧  b^{27, 21}_0 ∧ true) 
c  in CNF:
c     b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ false 
c  in DIMACS:
 14696 -14697 -14698  0
c  -3 does not represent an automaton state.
c    -( b^{27, 21}_2 ∧  b^{27, 21}_1 ∧  b^{27, 21}_0 ∧ true) 
c  in CNF:
c    -b^{27, 21}_2 ∨ -b^{27, 21}_1 ∨ -b^{27, 21}_0 ∨ false 
c  in DIMACS:
-14696 -14697 -14698  0

c i = 22
c  -2+1 --> -1
c    ( b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧  p_594) -> ( b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0)
c  in CNF:
c    -b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨  b^{27, 23}_2
c    -b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_1
c    -b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨  b^{27, 23}_0
c  in DIMACS:
-14699 -14700  14701 -594  14702 0
-14699 -14700  14701 -594 -14703 0
-14699 -14700  14701 -594  14704 0

c  -1+1 --> 0
c    ( b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0 ∧  p_594) -> (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧ -b^{27, 23}_0)
c  in CNF:
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_2
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_1
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_0
c  in DIMACS:
-14699  14700 -14701 -594 -14702 0
-14699  14700 -14701 -594 -14703 0
-14699  14700 -14701 -594 -14704 0

c  0+1 --> 1
c    (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧  p_594) -> (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0)
c  in CNF:
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_2
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_1
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨  b^{27, 23}_0
c  in DIMACS:
 14699  14700  14701 -594 -14702 0
 14699  14700  14701 -594 -14703 0
 14699  14700  14701 -594  14704 0

c  1+1 --> 2
c    (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0 ∧  p_594) -> (-b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0)
c  in CNF:
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_2
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨  b^{27, 23}_1
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ -p_594 ∨ -b^{27, 23}_0
c  in DIMACS:
 14699  14700 -14701 -594 -14702 0
 14699  14700 -14701 -594  14703 0
 14699  14700 -14701 -594 -14704 0

c  2+1 --> break 
c    (-b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧  p_594) -> break
c  in CNF:
c     b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 14699 -14700  14701 -594 1162 0


c  2-1 --> 1
c    (-b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧ -p_594) -> (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0)
c  in CNF:
c     b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_2
c     b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_1
c     b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨  b^{27, 23}_0
c  in DIMACS:
 14699 -14700  14701  594 -14702 0
 14699 -14700  14701  594 -14703 0
 14699 -14700  14701  594  14704 0

c  1-1 --> 0
c    (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0 ∧ -p_594) -> (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧ -b^{27, 23}_0)
c  in CNF:
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_2
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_1
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_0
c  in DIMACS:
 14699  14700 -14701  594 -14702 0
 14699  14700 -14701  594 -14703 0
 14699  14700 -14701  594 -14704 0

c  0-1 --> -1
c    (-b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧ -p_594) -> ( b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0)
c  in CNF:
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨  b^{27, 23}_2
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_1
c     b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨  b^{27, 23}_0
c  in DIMACS:
 14699  14700  14701  594  14702 0
 14699  14700  14701  594 -14703 0
 14699  14700  14701  594  14704 0

c  -1-1 --> -2
c    ( b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧  b^{27, 22}_0 ∧ -p_594) -> ( b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0)
c  in CNF:
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨  b^{27, 23}_2
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨  b^{27, 23}_1
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨  p_594 ∨ -b^{27, 23}_0
c  in DIMACS:
-14699  14700 -14701  594  14702 0
-14699  14700 -14701  594  14703 0
-14699  14700 -14701  594 -14704 0

c  -2-1 --> break 
c    ( b^{27, 22}_2 ∧  b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨  b^{27, 22}_0 ∨  p_594 ∨ break
c  in DIMACS:
-14699 -14700  14701  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 22}_2 ∧ -b^{27, 22}_1 ∧ -b^{27, 22}_0 ∧ true) 
c  in CNF:
c    -b^{27, 22}_2 ∨  b^{27, 22}_1 ∨  b^{27, 22}_0 ∨ false 
c  in DIMACS:
-14699  14700  14701  0

c  3 does not represent an automaton state.
c    -(-b^{27, 22}_2 ∧  b^{27, 22}_1 ∧  b^{27, 22}_0 ∧ true) 
c  in CNF:
c     b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ false 
c  in DIMACS:
 14699 -14700 -14701  0
c  -3 does not represent an automaton state.
c    -( b^{27, 22}_2 ∧  b^{27, 22}_1 ∧  b^{27, 22}_0 ∧ true) 
c  in CNF:
c    -b^{27, 22}_2 ∨ -b^{27, 22}_1 ∨ -b^{27, 22}_0 ∨ false 
c  in DIMACS:
-14699 -14700 -14701  0

c i = 23
c  -2+1 --> -1
c    ( b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧  p_621) -> ( b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0)
c  in CNF:
c    -b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨  b^{27, 24}_2
c    -b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_1
c    -b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨  b^{27, 24}_0
c  in DIMACS:
-14702 -14703  14704 -621  14705 0
-14702 -14703  14704 -621 -14706 0
-14702 -14703  14704 -621  14707 0

c  -1+1 --> 0
c    ( b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0 ∧  p_621) -> (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧ -b^{27, 24}_0)
c  in CNF:
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_2
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_1
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_0
c  in DIMACS:
-14702  14703 -14704 -621 -14705 0
-14702  14703 -14704 -621 -14706 0
-14702  14703 -14704 -621 -14707 0

c  0+1 --> 1
c    (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧  p_621) -> (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0)
c  in CNF:
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_2
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_1
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨  b^{27, 24}_0
c  in DIMACS:
 14702  14703  14704 -621 -14705 0
 14702  14703  14704 -621 -14706 0
 14702  14703  14704 -621  14707 0

c  1+1 --> 2
c    (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0 ∧  p_621) -> (-b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0)
c  in CNF:
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_2
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨  b^{27, 24}_1
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ -p_621 ∨ -b^{27, 24}_0
c  in DIMACS:
 14702  14703 -14704 -621 -14705 0
 14702  14703 -14704 -621  14706 0
 14702  14703 -14704 -621 -14707 0

c  2+1 --> break 
c    (-b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧  p_621) -> break
c  in CNF:
c     b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 14702 -14703  14704 -621 1162 0


c  2-1 --> 1
c    (-b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧ -p_621) -> (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0)
c  in CNF:
c     b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_2
c     b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_1
c     b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨  b^{27, 24}_0
c  in DIMACS:
 14702 -14703  14704  621 -14705 0
 14702 -14703  14704  621 -14706 0
 14702 -14703  14704  621  14707 0

c  1-1 --> 0
c    (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0 ∧ -p_621) -> (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧ -b^{27, 24}_0)
c  in CNF:
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_2
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_1
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_0
c  in DIMACS:
 14702  14703 -14704  621 -14705 0
 14702  14703 -14704  621 -14706 0
 14702  14703 -14704  621 -14707 0

c  0-1 --> -1
c    (-b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧ -p_621) -> ( b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0)
c  in CNF:
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨  b^{27, 24}_2
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_1
c     b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨  b^{27, 24}_0
c  in DIMACS:
 14702  14703  14704  621  14705 0
 14702  14703  14704  621 -14706 0
 14702  14703  14704  621  14707 0

c  -1-1 --> -2
c    ( b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧  b^{27, 23}_0 ∧ -p_621) -> ( b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0)
c  in CNF:
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨  b^{27, 24}_2
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨  b^{27, 24}_1
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨  p_621 ∨ -b^{27, 24}_0
c  in DIMACS:
-14702  14703 -14704  621  14705 0
-14702  14703 -14704  621  14706 0
-14702  14703 -14704  621 -14707 0

c  -2-1 --> break 
c    ( b^{27, 23}_2 ∧  b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨  b^{27, 23}_0 ∨  p_621 ∨ break
c  in DIMACS:
-14702 -14703  14704  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 23}_2 ∧ -b^{27, 23}_1 ∧ -b^{27, 23}_0 ∧ true) 
c  in CNF:
c    -b^{27, 23}_2 ∨  b^{27, 23}_1 ∨  b^{27, 23}_0 ∨ false 
c  in DIMACS:
-14702  14703  14704  0

c  3 does not represent an automaton state.
c    -(-b^{27, 23}_2 ∧  b^{27, 23}_1 ∧  b^{27, 23}_0 ∧ true) 
c  in CNF:
c     b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ false 
c  in DIMACS:
 14702 -14703 -14704  0
c  -3 does not represent an automaton state.
c    -( b^{27, 23}_2 ∧  b^{27, 23}_1 ∧  b^{27, 23}_0 ∧ true) 
c  in CNF:
c    -b^{27, 23}_2 ∨ -b^{27, 23}_1 ∨ -b^{27, 23}_0 ∨ false 
c  in DIMACS:
-14702 -14703 -14704  0

c i = 24
c  -2+1 --> -1
c    ( b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧  p_648) -> ( b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0)
c  in CNF:
c    -b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨  b^{27, 25}_2
c    -b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_1
c    -b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨  b^{27, 25}_0
c  in DIMACS:
-14705 -14706  14707 -648  14708 0
-14705 -14706  14707 -648 -14709 0
-14705 -14706  14707 -648  14710 0

c  -1+1 --> 0
c    ( b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0 ∧  p_648) -> (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧ -b^{27, 25}_0)
c  in CNF:
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_2
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_1
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_0
c  in DIMACS:
-14705  14706 -14707 -648 -14708 0
-14705  14706 -14707 -648 -14709 0
-14705  14706 -14707 -648 -14710 0

c  0+1 --> 1
c    (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧  p_648) -> (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0)
c  in CNF:
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_2
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_1
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨  b^{27, 25}_0
c  in DIMACS:
 14705  14706  14707 -648 -14708 0
 14705  14706  14707 -648 -14709 0
 14705  14706  14707 -648  14710 0

c  1+1 --> 2
c    (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0 ∧  p_648) -> (-b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0)
c  in CNF:
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_2
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨  b^{27, 25}_1
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ -p_648 ∨ -b^{27, 25}_0
c  in DIMACS:
 14705  14706 -14707 -648 -14708 0
 14705  14706 -14707 -648  14709 0
 14705  14706 -14707 -648 -14710 0

c  2+1 --> break 
c    (-b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧  p_648) -> break
c  in CNF:
c     b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 14705 -14706  14707 -648 1162 0


c  2-1 --> 1
c    (-b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧ -p_648) -> (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0)
c  in CNF:
c     b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_2
c     b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_1
c     b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨  b^{27, 25}_0
c  in DIMACS:
 14705 -14706  14707  648 -14708 0
 14705 -14706  14707  648 -14709 0
 14705 -14706  14707  648  14710 0

c  1-1 --> 0
c    (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0 ∧ -p_648) -> (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧ -b^{27, 25}_0)
c  in CNF:
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_2
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_1
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_0
c  in DIMACS:
 14705  14706 -14707  648 -14708 0
 14705  14706 -14707  648 -14709 0
 14705  14706 -14707  648 -14710 0

c  0-1 --> -1
c    (-b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧ -p_648) -> ( b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0)
c  in CNF:
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨  b^{27, 25}_2
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_1
c     b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨  b^{27, 25}_0
c  in DIMACS:
 14705  14706  14707  648  14708 0
 14705  14706  14707  648 -14709 0
 14705  14706  14707  648  14710 0

c  -1-1 --> -2
c    ( b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧  b^{27, 24}_0 ∧ -p_648) -> ( b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0)
c  in CNF:
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨  b^{27, 25}_2
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨  b^{27, 25}_1
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨  p_648 ∨ -b^{27, 25}_0
c  in DIMACS:
-14705  14706 -14707  648  14708 0
-14705  14706 -14707  648  14709 0
-14705  14706 -14707  648 -14710 0

c  -2-1 --> break 
c    ( b^{27, 24}_2 ∧  b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨  b^{27, 24}_0 ∨  p_648 ∨ break
c  in DIMACS:
-14705 -14706  14707  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 24}_2 ∧ -b^{27, 24}_1 ∧ -b^{27, 24}_0 ∧ true) 
c  in CNF:
c    -b^{27, 24}_2 ∨  b^{27, 24}_1 ∨  b^{27, 24}_0 ∨ false 
c  in DIMACS:
-14705  14706  14707  0

c  3 does not represent an automaton state.
c    -(-b^{27, 24}_2 ∧  b^{27, 24}_1 ∧  b^{27, 24}_0 ∧ true) 
c  in CNF:
c     b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ false 
c  in DIMACS:
 14705 -14706 -14707  0
c  -3 does not represent an automaton state.
c    -( b^{27, 24}_2 ∧  b^{27, 24}_1 ∧  b^{27, 24}_0 ∧ true) 
c  in CNF:
c    -b^{27, 24}_2 ∨ -b^{27, 24}_1 ∨ -b^{27, 24}_0 ∨ false 
c  in DIMACS:
-14705 -14706 -14707  0

c i = 25
c  -2+1 --> -1
c    ( b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧  p_675) -> ( b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0)
c  in CNF:
c    -b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨  b^{27, 26}_2
c    -b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_1
c    -b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨  b^{27, 26}_0
c  in DIMACS:
-14708 -14709  14710 -675  14711 0
-14708 -14709  14710 -675 -14712 0
-14708 -14709  14710 -675  14713 0

c  -1+1 --> 0
c    ( b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0 ∧  p_675) -> (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧ -b^{27, 26}_0)
c  in CNF:
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_2
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_1
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_0
c  in DIMACS:
-14708  14709 -14710 -675 -14711 0
-14708  14709 -14710 -675 -14712 0
-14708  14709 -14710 -675 -14713 0

c  0+1 --> 1
c    (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧  p_675) -> (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0)
c  in CNF:
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_2
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_1
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨  b^{27, 26}_0
c  in DIMACS:
 14708  14709  14710 -675 -14711 0
 14708  14709  14710 -675 -14712 0
 14708  14709  14710 -675  14713 0

c  1+1 --> 2
c    (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0 ∧  p_675) -> (-b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0)
c  in CNF:
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_2
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨  b^{27, 26}_1
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ -p_675 ∨ -b^{27, 26}_0
c  in DIMACS:
 14708  14709 -14710 -675 -14711 0
 14708  14709 -14710 -675  14712 0
 14708  14709 -14710 -675 -14713 0

c  2+1 --> break 
c    (-b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧  p_675) -> break
c  in CNF:
c     b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 14708 -14709  14710 -675 1162 0


c  2-1 --> 1
c    (-b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧ -p_675) -> (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0)
c  in CNF:
c     b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_2
c     b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_1
c     b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨  b^{27, 26}_0
c  in DIMACS:
 14708 -14709  14710  675 -14711 0
 14708 -14709  14710  675 -14712 0
 14708 -14709  14710  675  14713 0

c  1-1 --> 0
c    (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0 ∧ -p_675) -> (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧ -b^{27, 26}_0)
c  in CNF:
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_2
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_1
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_0
c  in DIMACS:
 14708  14709 -14710  675 -14711 0
 14708  14709 -14710  675 -14712 0
 14708  14709 -14710  675 -14713 0

c  0-1 --> -1
c    (-b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧ -p_675) -> ( b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0)
c  in CNF:
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨  b^{27, 26}_2
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_1
c     b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨  b^{27, 26}_0
c  in DIMACS:
 14708  14709  14710  675  14711 0
 14708  14709  14710  675 -14712 0
 14708  14709  14710  675  14713 0

c  -1-1 --> -2
c    ( b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧  b^{27, 25}_0 ∧ -p_675) -> ( b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0)
c  in CNF:
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨  b^{27, 26}_2
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨  b^{27, 26}_1
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨  p_675 ∨ -b^{27, 26}_0
c  in DIMACS:
-14708  14709 -14710  675  14711 0
-14708  14709 -14710  675  14712 0
-14708  14709 -14710  675 -14713 0

c  -2-1 --> break 
c    ( b^{27, 25}_2 ∧  b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨  b^{27, 25}_0 ∨  p_675 ∨ break
c  in DIMACS:
-14708 -14709  14710  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 25}_2 ∧ -b^{27, 25}_1 ∧ -b^{27, 25}_0 ∧ true) 
c  in CNF:
c    -b^{27, 25}_2 ∨  b^{27, 25}_1 ∨  b^{27, 25}_0 ∨ false 
c  in DIMACS:
-14708  14709  14710  0

c  3 does not represent an automaton state.
c    -(-b^{27, 25}_2 ∧  b^{27, 25}_1 ∧  b^{27, 25}_0 ∧ true) 
c  in CNF:
c     b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ false 
c  in DIMACS:
 14708 -14709 -14710  0
c  -3 does not represent an automaton state.
c    -( b^{27, 25}_2 ∧  b^{27, 25}_1 ∧  b^{27, 25}_0 ∧ true) 
c  in CNF:
c    -b^{27, 25}_2 ∨ -b^{27, 25}_1 ∨ -b^{27, 25}_0 ∨ false 
c  in DIMACS:
-14708 -14709 -14710  0

c i = 26
c  -2+1 --> -1
c    ( b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧  p_702) -> ( b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0)
c  in CNF:
c    -b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨  b^{27, 27}_2
c    -b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_1
c    -b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨  b^{27, 27}_0
c  in DIMACS:
-14711 -14712  14713 -702  14714 0
-14711 -14712  14713 -702 -14715 0
-14711 -14712  14713 -702  14716 0

c  -1+1 --> 0
c    ( b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0 ∧  p_702) -> (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧ -b^{27, 27}_0)
c  in CNF:
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_2
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_1
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_0
c  in DIMACS:
-14711  14712 -14713 -702 -14714 0
-14711  14712 -14713 -702 -14715 0
-14711  14712 -14713 -702 -14716 0

c  0+1 --> 1
c    (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧  p_702) -> (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0)
c  in CNF:
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_2
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_1
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨  b^{27, 27}_0
c  in DIMACS:
 14711  14712  14713 -702 -14714 0
 14711  14712  14713 -702 -14715 0
 14711  14712  14713 -702  14716 0

c  1+1 --> 2
c    (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0 ∧  p_702) -> (-b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0)
c  in CNF:
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_2
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨  b^{27, 27}_1
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ -p_702 ∨ -b^{27, 27}_0
c  in DIMACS:
 14711  14712 -14713 -702 -14714 0
 14711  14712 -14713 -702  14715 0
 14711  14712 -14713 -702 -14716 0

c  2+1 --> break 
c    (-b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧  p_702) -> break
c  in CNF:
c     b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 14711 -14712  14713 -702 1162 0


c  2-1 --> 1
c    (-b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧ -p_702) -> (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0)
c  in CNF:
c     b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_2
c     b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_1
c     b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨  b^{27, 27}_0
c  in DIMACS:
 14711 -14712  14713  702 -14714 0
 14711 -14712  14713  702 -14715 0
 14711 -14712  14713  702  14716 0

c  1-1 --> 0
c    (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0 ∧ -p_702) -> (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧ -b^{27, 27}_0)
c  in CNF:
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_2
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_1
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_0
c  in DIMACS:
 14711  14712 -14713  702 -14714 0
 14711  14712 -14713  702 -14715 0
 14711  14712 -14713  702 -14716 0

c  0-1 --> -1
c    (-b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧ -p_702) -> ( b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0)
c  in CNF:
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨  b^{27, 27}_2
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_1
c     b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨  b^{27, 27}_0
c  in DIMACS:
 14711  14712  14713  702  14714 0
 14711  14712  14713  702 -14715 0
 14711  14712  14713  702  14716 0

c  -1-1 --> -2
c    ( b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧  b^{27, 26}_0 ∧ -p_702) -> ( b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0)
c  in CNF:
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨  b^{27, 27}_2
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨  b^{27, 27}_1
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨  p_702 ∨ -b^{27, 27}_0
c  in DIMACS:
-14711  14712 -14713  702  14714 0
-14711  14712 -14713  702  14715 0
-14711  14712 -14713  702 -14716 0

c  -2-1 --> break 
c    ( b^{27, 26}_2 ∧  b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨  b^{27, 26}_0 ∨  p_702 ∨ break
c  in DIMACS:
-14711 -14712  14713  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 26}_2 ∧ -b^{27, 26}_1 ∧ -b^{27, 26}_0 ∧ true) 
c  in CNF:
c    -b^{27, 26}_2 ∨  b^{27, 26}_1 ∨  b^{27, 26}_0 ∨ false 
c  in DIMACS:
-14711  14712  14713  0

c  3 does not represent an automaton state.
c    -(-b^{27, 26}_2 ∧  b^{27, 26}_1 ∧  b^{27, 26}_0 ∧ true) 
c  in CNF:
c     b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ false 
c  in DIMACS:
 14711 -14712 -14713  0
c  -3 does not represent an automaton state.
c    -( b^{27, 26}_2 ∧  b^{27, 26}_1 ∧  b^{27, 26}_0 ∧ true) 
c  in CNF:
c    -b^{27, 26}_2 ∨ -b^{27, 26}_1 ∨ -b^{27, 26}_0 ∨ false 
c  in DIMACS:
-14711 -14712 -14713  0

c i = 27
c  -2+1 --> -1
c    ( b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧  p_729) -> ( b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0)
c  in CNF:
c    -b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨  b^{27, 28}_2
c    -b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_1
c    -b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨  b^{27, 28}_0
c  in DIMACS:
-14714 -14715  14716 -729  14717 0
-14714 -14715  14716 -729 -14718 0
-14714 -14715  14716 -729  14719 0

c  -1+1 --> 0
c    ( b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0 ∧  p_729) -> (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧ -b^{27, 28}_0)
c  in CNF:
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_2
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_1
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_0
c  in DIMACS:
-14714  14715 -14716 -729 -14717 0
-14714  14715 -14716 -729 -14718 0
-14714  14715 -14716 -729 -14719 0

c  0+1 --> 1
c    (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧  p_729) -> (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0)
c  in CNF:
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_2
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_1
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨  b^{27, 28}_0
c  in DIMACS:
 14714  14715  14716 -729 -14717 0
 14714  14715  14716 -729 -14718 0
 14714  14715  14716 -729  14719 0

c  1+1 --> 2
c    (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0 ∧  p_729) -> (-b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0)
c  in CNF:
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_2
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨  b^{27, 28}_1
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ -p_729 ∨ -b^{27, 28}_0
c  in DIMACS:
 14714  14715 -14716 -729 -14717 0
 14714  14715 -14716 -729  14718 0
 14714  14715 -14716 -729 -14719 0

c  2+1 --> break 
c    (-b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧  p_729) -> break
c  in CNF:
c     b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 14714 -14715  14716 -729 1162 0


c  2-1 --> 1
c    (-b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧ -p_729) -> (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0)
c  in CNF:
c     b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_2
c     b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_1
c     b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨  b^{27, 28}_0
c  in DIMACS:
 14714 -14715  14716  729 -14717 0
 14714 -14715  14716  729 -14718 0
 14714 -14715  14716  729  14719 0

c  1-1 --> 0
c    (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0 ∧ -p_729) -> (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧ -b^{27, 28}_0)
c  in CNF:
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_2
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_1
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_0
c  in DIMACS:
 14714  14715 -14716  729 -14717 0
 14714  14715 -14716  729 -14718 0
 14714  14715 -14716  729 -14719 0

c  0-1 --> -1
c    (-b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧ -p_729) -> ( b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0)
c  in CNF:
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨  b^{27, 28}_2
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_1
c     b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨  b^{27, 28}_0
c  in DIMACS:
 14714  14715  14716  729  14717 0
 14714  14715  14716  729 -14718 0
 14714  14715  14716  729  14719 0

c  -1-1 --> -2
c    ( b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧  b^{27, 27}_0 ∧ -p_729) -> ( b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0)
c  in CNF:
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨  b^{27, 28}_2
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨  b^{27, 28}_1
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨  p_729 ∨ -b^{27, 28}_0
c  in DIMACS:
-14714  14715 -14716  729  14717 0
-14714  14715 -14716  729  14718 0
-14714  14715 -14716  729 -14719 0

c  -2-1 --> break 
c    ( b^{27, 27}_2 ∧  b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨  b^{27, 27}_0 ∨  p_729 ∨ break
c  in DIMACS:
-14714 -14715  14716  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 27}_2 ∧ -b^{27, 27}_1 ∧ -b^{27, 27}_0 ∧ true) 
c  in CNF:
c    -b^{27, 27}_2 ∨  b^{27, 27}_1 ∨  b^{27, 27}_0 ∨ false 
c  in DIMACS:
-14714  14715  14716  0

c  3 does not represent an automaton state.
c    -(-b^{27, 27}_2 ∧  b^{27, 27}_1 ∧  b^{27, 27}_0 ∧ true) 
c  in CNF:
c     b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ false 
c  in DIMACS:
 14714 -14715 -14716  0
c  -3 does not represent an automaton state.
c    -( b^{27, 27}_2 ∧  b^{27, 27}_1 ∧  b^{27, 27}_0 ∧ true) 
c  in CNF:
c    -b^{27, 27}_2 ∨ -b^{27, 27}_1 ∨ -b^{27, 27}_0 ∨ false 
c  in DIMACS:
-14714 -14715 -14716  0

c i = 28
c  -2+1 --> -1
c    ( b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧  p_756) -> ( b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0)
c  in CNF:
c    -b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨  b^{27, 29}_2
c    -b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_1
c    -b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨  b^{27, 29}_0
c  in DIMACS:
-14717 -14718  14719 -756  14720 0
-14717 -14718  14719 -756 -14721 0
-14717 -14718  14719 -756  14722 0

c  -1+1 --> 0
c    ( b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0 ∧  p_756) -> (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧ -b^{27, 29}_0)
c  in CNF:
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_2
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_1
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_0
c  in DIMACS:
-14717  14718 -14719 -756 -14720 0
-14717  14718 -14719 -756 -14721 0
-14717  14718 -14719 -756 -14722 0

c  0+1 --> 1
c    (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧  p_756) -> (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0)
c  in CNF:
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_2
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_1
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨  b^{27, 29}_0
c  in DIMACS:
 14717  14718  14719 -756 -14720 0
 14717  14718  14719 -756 -14721 0
 14717  14718  14719 -756  14722 0

c  1+1 --> 2
c    (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0 ∧  p_756) -> (-b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0)
c  in CNF:
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_2
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨  b^{27, 29}_1
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ -p_756 ∨ -b^{27, 29}_0
c  in DIMACS:
 14717  14718 -14719 -756 -14720 0
 14717  14718 -14719 -756  14721 0
 14717  14718 -14719 -756 -14722 0

c  2+1 --> break 
c    (-b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧  p_756) -> break
c  in CNF:
c     b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 14717 -14718  14719 -756 1162 0


c  2-1 --> 1
c    (-b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧ -p_756) -> (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0)
c  in CNF:
c     b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_2
c     b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_1
c     b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨  b^{27, 29}_0
c  in DIMACS:
 14717 -14718  14719  756 -14720 0
 14717 -14718  14719  756 -14721 0
 14717 -14718  14719  756  14722 0

c  1-1 --> 0
c    (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0 ∧ -p_756) -> (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧ -b^{27, 29}_0)
c  in CNF:
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_2
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_1
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_0
c  in DIMACS:
 14717  14718 -14719  756 -14720 0
 14717  14718 -14719  756 -14721 0
 14717  14718 -14719  756 -14722 0

c  0-1 --> -1
c    (-b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧ -p_756) -> ( b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0)
c  in CNF:
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨  b^{27, 29}_2
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_1
c     b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨  b^{27, 29}_0
c  in DIMACS:
 14717  14718  14719  756  14720 0
 14717  14718  14719  756 -14721 0
 14717  14718  14719  756  14722 0

c  -1-1 --> -2
c    ( b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧  b^{27, 28}_0 ∧ -p_756) -> ( b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0)
c  in CNF:
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨  b^{27, 29}_2
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨  b^{27, 29}_1
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨  p_756 ∨ -b^{27, 29}_0
c  in DIMACS:
-14717  14718 -14719  756  14720 0
-14717  14718 -14719  756  14721 0
-14717  14718 -14719  756 -14722 0

c  -2-1 --> break 
c    ( b^{27, 28}_2 ∧  b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨  b^{27, 28}_0 ∨  p_756 ∨ break
c  in DIMACS:
-14717 -14718  14719  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 28}_2 ∧ -b^{27, 28}_1 ∧ -b^{27, 28}_0 ∧ true) 
c  in CNF:
c    -b^{27, 28}_2 ∨  b^{27, 28}_1 ∨  b^{27, 28}_0 ∨ false 
c  in DIMACS:
-14717  14718  14719  0

c  3 does not represent an automaton state.
c    -(-b^{27, 28}_2 ∧  b^{27, 28}_1 ∧  b^{27, 28}_0 ∧ true) 
c  in CNF:
c     b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ false 
c  in DIMACS:
 14717 -14718 -14719  0
c  -3 does not represent an automaton state.
c    -( b^{27, 28}_2 ∧  b^{27, 28}_1 ∧  b^{27, 28}_0 ∧ true) 
c  in CNF:
c    -b^{27, 28}_2 ∨ -b^{27, 28}_1 ∨ -b^{27, 28}_0 ∨ false 
c  in DIMACS:
-14717 -14718 -14719  0

c i = 29
c  -2+1 --> -1
c    ( b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧  p_783) -> ( b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0)
c  in CNF:
c    -b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨  b^{27, 30}_2
c    -b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_1
c    -b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨  b^{27, 30}_0
c  in DIMACS:
-14720 -14721  14722 -783  14723 0
-14720 -14721  14722 -783 -14724 0
-14720 -14721  14722 -783  14725 0

c  -1+1 --> 0
c    ( b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0 ∧  p_783) -> (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧ -b^{27, 30}_0)
c  in CNF:
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_2
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_1
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_0
c  in DIMACS:
-14720  14721 -14722 -783 -14723 0
-14720  14721 -14722 -783 -14724 0
-14720  14721 -14722 -783 -14725 0

c  0+1 --> 1
c    (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧  p_783) -> (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0)
c  in CNF:
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_2
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_1
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨  b^{27, 30}_0
c  in DIMACS:
 14720  14721  14722 -783 -14723 0
 14720  14721  14722 -783 -14724 0
 14720  14721  14722 -783  14725 0

c  1+1 --> 2
c    (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0 ∧  p_783) -> (-b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0)
c  in CNF:
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_2
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨  b^{27, 30}_1
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ -p_783 ∨ -b^{27, 30}_0
c  in DIMACS:
 14720  14721 -14722 -783 -14723 0
 14720  14721 -14722 -783  14724 0
 14720  14721 -14722 -783 -14725 0

c  2+1 --> break 
c    (-b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧  p_783) -> break
c  in CNF:
c     b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 14720 -14721  14722 -783 1162 0


c  2-1 --> 1
c    (-b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧ -p_783) -> (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0)
c  in CNF:
c     b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_2
c     b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_1
c     b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨  b^{27, 30}_0
c  in DIMACS:
 14720 -14721  14722  783 -14723 0
 14720 -14721  14722  783 -14724 0
 14720 -14721  14722  783  14725 0

c  1-1 --> 0
c    (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0 ∧ -p_783) -> (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧ -b^{27, 30}_0)
c  in CNF:
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_2
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_1
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_0
c  in DIMACS:
 14720  14721 -14722  783 -14723 0
 14720  14721 -14722  783 -14724 0
 14720  14721 -14722  783 -14725 0

c  0-1 --> -1
c    (-b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧ -p_783) -> ( b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0)
c  in CNF:
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨  b^{27, 30}_2
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_1
c     b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨  b^{27, 30}_0
c  in DIMACS:
 14720  14721  14722  783  14723 0
 14720  14721  14722  783 -14724 0
 14720  14721  14722  783  14725 0

c  -1-1 --> -2
c    ( b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧  b^{27, 29}_0 ∧ -p_783) -> ( b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0)
c  in CNF:
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨  b^{27, 30}_2
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨  b^{27, 30}_1
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨  p_783 ∨ -b^{27, 30}_0
c  in DIMACS:
-14720  14721 -14722  783  14723 0
-14720  14721 -14722  783  14724 0
-14720  14721 -14722  783 -14725 0

c  -2-1 --> break 
c    ( b^{27, 29}_2 ∧  b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨  b^{27, 29}_0 ∨  p_783 ∨ break
c  in DIMACS:
-14720 -14721  14722  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 29}_2 ∧ -b^{27, 29}_1 ∧ -b^{27, 29}_0 ∧ true) 
c  in CNF:
c    -b^{27, 29}_2 ∨  b^{27, 29}_1 ∨  b^{27, 29}_0 ∨ false 
c  in DIMACS:
-14720  14721  14722  0

c  3 does not represent an automaton state.
c    -(-b^{27, 29}_2 ∧  b^{27, 29}_1 ∧  b^{27, 29}_0 ∧ true) 
c  in CNF:
c     b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ false 
c  in DIMACS:
 14720 -14721 -14722  0
c  -3 does not represent an automaton state.
c    -( b^{27, 29}_2 ∧  b^{27, 29}_1 ∧  b^{27, 29}_0 ∧ true) 
c  in CNF:
c    -b^{27, 29}_2 ∨ -b^{27, 29}_1 ∨ -b^{27, 29}_0 ∨ false 
c  in DIMACS:
-14720 -14721 -14722  0

c i = 30
c  -2+1 --> -1
c    ( b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧  p_810) -> ( b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0)
c  in CNF:
c    -b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨  b^{27, 31}_2
c    -b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_1
c    -b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨  b^{27, 31}_0
c  in DIMACS:
-14723 -14724  14725 -810  14726 0
-14723 -14724  14725 -810 -14727 0
-14723 -14724  14725 -810  14728 0

c  -1+1 --> 0
c    ( b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0 ∧  p_810) -> (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧ -b^{27, 31}_0)
c  in CNF:
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_2
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_1
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_0
c  in DIMACS:
-14723  14724 -14725 -810 -14726 0
-14723  14724 -14725 -810 -14727 0
-14723  14724 -14725 -810 -14728 0

c  0+1 --> 1
c    (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧  p_810) -> (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0)
c  in CNF:
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_2
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_1
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨  b^{27, 31}_0
c  in DIMACS:
 14723  14724  14725 -810 -14726 0
 14723  14724  14725 -810 -14727 0
 14723  14724  14725 -810  14728 0

c  1+1 --> 2
c    (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0 ∧  p_810) -> (-b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0)
c  in CNF:
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_2
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨  b^{27, 31}_1
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ -p_810 ∨ -b^{27, 31}_0
c  in DIMACS:
 14723  14724 -14725 -810 -14726 0
 14723  14724 -14725 -810  14727 0
 14723  14724 -14725 -810 -14728 0

c  2+1 --> break 
c    (-b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧  p_810) -> break
c  in CNF:
c     b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 14723 -14724  14725 -810 1162 0


c  2-1 --> 1
c    (-b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧ -p_810) -> (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0)
c  in CNF:
c     b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_2
c     b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_1
c     b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨  b^{27, 31}_0
c  in DIMACS:
 14723 -14724  14725  810 -14726 0
 14723 -14724  14725  810 -14727 0
 14723 -14724  14725  810  14728 0

c  1-1 --> 0
c    (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0 ∧ -p_810) -> (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧ -b^{27, 31}_0)
c  in CNF:
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_2
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_1
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_0
c  in DIMACS:
 14723  14724 -14725  810 -14726 0
 14723  14724 -14725  810 -14727 0
 14723  14724 -14725  810 -14728 0

c  0-1 --> -1
c    (-b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧ -p_810) -> ( b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0)
c  in CNF:
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨  b^{27, 31}_2
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_1
c     b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨  b^{27, 31}_0
c  in DIMACS:
 14723  14724  14725  810  14726 0
 14723  14724  14725  810 -14727 0
 14723  14724  14725  810  14728 0

c  -1-1 --> -2
c    ( b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧  b^{27, 30}_0 ∧ -p_810) -> ( b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0)
c  in CNF:
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨  b^{27, 31}_2
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨  b^{27, 31}_1
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨  p_810 ∨ -b^{27, 31}_0
c  in DIMACS:
-14723  14724 -14725  810  14726 0
-14723  14724 -14725  810  14727 0
-14723  14724 -14725  810 -14728 0

c  -2-1 --> break 
c    ( b^{27, 30}_2 ∧  b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨  b^{27, 30}_0 ∨  p_810 ∨ break
c  in DIMACS:
-14723 -14724  14725  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 30}_2 ∧ -b^{27, 30}_1 ∧ -b^{27, 30}_0 ∧ true) 
c  in CNF:
c    -b^{27, 30}_2 ∨  b^{27, 30}_1 ∨  b^{27, 30}_0 ∨ false 
c  in DIMACS:
-14723  14724  14725  0

c  3 does not represent an automaton state.
c    -(-b^{27, 30}_2 ∧  b^{27, 30}_1 ∧  b^{27, 30}_0 ∧ true) 
c  in CNF:
c     b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ false 
c  in DIMACS:
 14723 -14724 -14725  0
c  -3 does not represent an automaton state.
c    -( b^{27, 30}_2 ∧  b^{27, 30}_1 ∧  b^{27, 30}_0 ∧ true) 
c  in CNF:
c    -b^{27, 30}_2 ∨ -b^{27, 30}_1 ∨ -b^{27, 30}_0 ∨ false 
c  in DIMACS:
-14723 -14724 -14725  0

c i = 31
c  -2+1 --> -1
c    ( b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧  p_837) -> ( b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0)
c  in CNF:
c    -b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨  b^{27, 32}_2
c    -b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_1
c    -b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨  b^{27, 32}_0
c  in DIMACS:
-14726 -14727  14728 -837  14729 0
-14726 -14727  14728 -837 -14730 0
-14726 -14727  14728 -837  14731 0

c  -1+1 --> 0
c    ( b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0 ∧  p_837) -> (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧ -b^{27, 32}_0)
c  in CNF:
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_2
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_1
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_0
c  in DIMACS:
-14726  14727 -14728 -837 -14729 0
-14726  14727 -14728 -837 -14730 0
-14726  14727 -14728 -837 -14731 0

c  0+1 --> 1
c    (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧  p_837) -> (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0)
c  in CNF:
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_2
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_1
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨  b^{27, 32}_0
c  in DIMACS:
 14726  14727  14728 -837 -14729 0
 14726  14727  14728 -837 -14730 0
 14726  14727  14728 -837  14731 0

c  1+1 --> 2
c    (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0 ∧  p_837) -> (-b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0)
c  in CNF:
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_2
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨  b^{27, 32}_1
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ -p_837 ∨ -b^{27, 32}_0
c  in DIMACS:
 14726  14727 -14728 -837 -14729 0
 14726  14727 -14728 -837  14730 0
 14726  14727 -14728 -837 -14731 0

c  2+1 --> break 
c    (-b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧  p_837) -> break
c  in CNF:
c     b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 14726 -14727  14728 -837 1162 0


c  2-1 --> 1
c    (-b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧ -p_837) -> (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0)
c  in CNF:
c     b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_2
c     b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_1
c     b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨  b^{27, 32}_0
c  in DIMACS:
 14726 -14727  14728  837 -14729 0
 14726 -14727  14728  837 -14730 0
 14726 -14727  14728  837  14731 0

c  1-1 --> 0
c    (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0 ∧ -p_837) -> (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧ -b^{27, 32}_0)
c  in CNF:
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_2
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_1
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_0
c  in DIMACS:
 14726  14727 -14728  837 -14729 0
 14726  14727 -14728  837 -14730 0
 14726  14727 -14728  837 -14731 0

c  0-1 --> -1
c    (-b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧ -p_837) -> ( b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0)
c  in CNF:
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨  b^{27, 32}_2
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_1
c     b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨  b^{27, 32}_0
c  in DIMACS:
 14726  14727  14728  837  14729 0
 14726  14727  14728  837 -14730 0
 14726  14727  14728  837  14731 0

c  -1-1 --> -2
c    ( b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧  b^{27, 31}_0 ∧ -p_837) -> ( b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0)
c  in CNF:
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨  b^{27, 32}_2
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨  b^{27, 32}_1
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨  p_837 ∨ -b^{27, 32}_0
c  in DIMACS:
-14726  14727 -14728  837  14729 0
-14726  14727 -14728  837  14730 0
-14726  14727 -14728  837 -14731 0

c  -2-1 --> break 
c    ( b^{27, 31}_2 ∧  b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨  b^{27, 31}_0 ∨  p_837 ∨ break
c  in DIMACS:
-14726 -14727  14728  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 31}_2 ∧ -b^{27, 31}_1 ∧ -b^{27, 31}_0 ∧ true) 
c  in CNF:
c    -b^{27, 31}_2 ∨  b^{27, 31}_1 ∨  b^{27, 31}_0 ∨ false 
c  in DIMACS:
-14726  14727  14728  0

c  3 does not represent an automaton state.
c    -(-b^{27, 31}_2 ∧  b^{27, 31}_1 ∧  b^{27, 31}_0 ∧ true) 
c  in CNF:
c     b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ false 
c  in DIMACS:
 14726 -14727 -14728  0
c  -3 does not represent an automaton state.
c    -( b^{27, 31}_2 ∧  b^{27, 31}_1 ∧  b^{27, 31}_0 ∧ true) 
c  in CNF:
c    -b^{27, 31}_2 ∨ -b^{27, 31}_1 ∨ -b^{27, 31}_0 ∨ false 
c  in DIMACS:
-14726 -14727 -14728  0

c i = 32
c  -2+1 --> -1
c    ( b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧  p_864) -> ( b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0)
c  in CNF:
c    -b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨  b^{27, 33}_2
c    -b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_1
c    -b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨  b^{27, 33}_0
c  in DIMACS:
-14729 -14730  14731 -864  14732 0
-14729 -14730  14731 -864 -14733 0
-14729 -14730  14731 -864  14734 0

c  -1+1 --> 0
c    ( b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0 ∧  p_864) -> (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧ -b^{27, 33}_0)
c  in CNF:
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_2
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_1
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_0
c  in DIMACS:
-14729  14730 -14731 -864 -14732 0
-14729  14730 -14731 -864 -14733 0
-14729  14730 -14731 -864 -14734 0

c  0+1 --> 1
c    (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧  p_864) -> (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0)
c  in CNF:
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_2
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_1
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨  b^{27, 33}_0
c  in DIMACS:
 14729  14730  14731 -864 -14732 0
 14729  14730  14731 -864 -14733 0
 14729  14730  14731 -864  14734 0

c  1+1 --> 2
c    (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0 ∧  p_864) -> (-b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0)
c  in CNF:
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_2
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨  b^{27, 33}_1
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ -p_864 ∨ -b^{27, 33}_0
c  in DIMACS:
 14729  14730 -14731 -864 -14732 0
 14729  14730 -14731 -864  14733 0
 14729  14730 -14731 -864 -14734 0

c  2+1 --> break 
c    (-b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧  p_864) -> break
c  in CNF:
c     b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 14729 -14730  14731 -864 1162 0


c  2-1 --> 1
c    (-b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧ -p_864) -> (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0)
c  in CNF:
c     b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_2
c     b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_1
c     b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨  b^{27, 33}_0
c  in DIMACS:
 14729 -14730  14731  864 -14732 0
 14729 -14730  14731  864 -14733 0
 14729 -14730  14731  864  14734 0

c  1-1 --> 0
c    (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0 ∧ -p_864) -> (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧ -b^{27, 33}_0)
c  in CNF:
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_2
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_1
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_0
c  in DIMACS:
 14729  14730 -14731  864 -14732 0
 14729  14730 -14731  864 -14733 0
 14729  14730 -14731  864 -14734 0

c  0-1 --> -1
c    (-b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧ -p_864) -> ( b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0)
c  in CNF:
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨  b^{27, 33}_2
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_1
c     b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨  b^{27, 33}_0
c  in DIMACS:
 14729  14730  14731  864  14732 0
 14729  14730  14731  864 -14733 0
 14729  14730  14731  864  14734 0

c  -1-1 --> -2
c    ( b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧  b^{27, 32}_0 ∧ -p_864) -> ( b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0)
c  in CNF:
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨  b^{27, 33}_2
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨  b^{27, 33}_1
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨  p_864 ∨ -b^{27, 33}_0
c  in DIMACS:
-14729  14730 -14731  864  14732 0
-14729  14730 -14731  864  14733 0
-14729  14730 -14731  864 -14734 0

c  -2-1 --> break 
c    ( b^{27, 32}_2 ∧  b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨  b^{27, 32}_0 ∨  p_864 ∨ break
c  in DIMACS:
-14729 -14730  14731  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 32}_2 ∧ -b^{27, 32}_1 ∧ -b^{27, 32}_0 ∧ true) 
c  in CNF:
c    -b^{27, 32}_2 ∨  b^{27, 32}_1 ∨  b^{27, 32}_0 ∨ false 
c  in DIMACS:
-14729  14730  14731  0

c  3 does not represent an automaton state.
c    -(-b^{27, 32}_2 ∧  b^{27, 32}_1 ∧  b^{27, 32}_0 ∧ true) 
c  in CNF:
c     b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ false 
c  in DIMACS:
 14729 -14730 -14731  0
c  -3 does not represent an automaton state.
c    -( b^{27, 32}_2 ∧  b^{27, 32}_1 ∧  b^{27, 32}_0 ∧ true) 
c  in CNF:
c    -b^{27, 32}_2 ∨ -b^{27, 32}_1 ∨ -b^{27, 32}_0 ∨ false 
c  in DIMACS:
-14729 -14730 -14731  0

c i = 33
c  -2+1 --> -1
c    ( b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧  p_891) -> ( b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0)
c  in CNF:
c    -b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨  b^{27, 34}_2
c    -b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_1
c    -b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨  b^{27, 34}_0
c  in DIMACS:
-14732 -14733  14734 -891  14735 0
-14732 -14733  14734 -891 -14736 0
-14732 -14733  14734 -891  14737 0

c  -1+1 --> 0
c    ( b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0 ∧  p_891) -> (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧ -b^{27, 34}_0)
c  in CNF:
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_2
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_1
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_0
c  in DIMACS:
-14732  14733 -14734 -891 -14735 0
-14732  14733 -14734 -891 -14736 0
-14732  14733 -14734 -891 -14737 0

c  0+1 --> 1
c    (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧  p_891) -> (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0)
c  in CNF:
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_2
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_1
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨  b^{27, 34}_0
c  in DIMACS:
 14732  14733  14734 -891 -14735 0
 14732  14733  14734 -891 -14736 0
 14732  14733  14734 -891  14737 0

c  1+1 --> 2
c    (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0 ∧  p_891) -> (-b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0)
c  in CNF:
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_2
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨  b^{27, 34}_1
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ -p_891 ∨ -b^{27, 34}_0
c  in DIMACS:
 14732  14733 -14734 -891 -14735 0
 14732  14733 -14734 -891  14736 0
 14732  14733 -14734 -891 -14737 0

c  2+1 --> break 
c    (-b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧  p_891) -> break
c  in CNF:
c     b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 14732 -14733  14734 -891 1162 0


c  2-1 --> 1
c    (-b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧ -p_891) -> (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0)
c  in CNF:
c     b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_2
c     b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_1
c     b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨  b^{27, 34}_0
c  in DIMACS:
 14732 -14733  14734  891 -14735 0
 14732 -14733  14734  891 -14736 0
 14732 -14733  14734  891  14737 0

c  1-1 --> 0
c    (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0 ∧ -p_891) -> (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧ -b^{27, 34}_0)
c  in CNF:
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_2
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_1
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_0
c  in DIMACS:
 14732  14733 -14734  891 -14735 0
 14732  14733 -14734  891 -14736 0
 14732  14733 -14734  891 -14737 0

c  0-1 --> -1
c    (-b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧ -p_891) -> ( b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0)
c  in CNF:
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨  b^{27, 34}_2
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_1
c     b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨  b^{27, 34}_0
c  in DIMACS:
 14732  14733  14734  891  14735 0
 14732  14733  14734  891 -14736 0
 14732  14733  14734  891  14737 0

c  -1-1 --> -2
c    ( b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧  b^{27, 33}_0 ∧ -p_891) -> ( b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0)
c  in CNF:
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨  b^{27, 34}_2
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨  b^{27, 34}_1
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨  p_891 ∨ -b^{27, 34}_0
c  in DIMACS:
-14732  14733 -14734  891  14735 0
-14732  14733 -14734  891  14736 0
-14732  14733 -14734  891 -14737 0

c  -2-1 --> break 
c    ( b^{27, 33}_2 ∧  b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨  b^{27, 33}_0 ∨  p_891 ∨ break
c  in DIMACS:
-14732 -14733  14734  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 33}_2 ∧ -b^{27, 33}_1 ∧ -b^{27, 33}_0 ∧ true) 
c  in CNF:
c    -b^{27, 33}_2 ∨  b^{27, 33}_1 ∨  b^{27, 33}_0 ∨ false 
c  in DIMACS:
-14732  14733  14734  0

c  3 does not represent an automaton state.
c    -(-b^{27, 33}_2 ∧  b^{27, 33}_1 ∧  b^{27, 33}_0 ∧ true) 
c  in CNF:
c     b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ false 
c  in DIMACS:
 14732 -14733 -14734  0
c  -3 does not represent an automaton state.
c    -( b^{27, 33}_2 ∧  b^{27, 33}_1 ∧  b^{27, 33}_0 ∧ true) 
c  in CNF:
c    -b^{27, 33}_2 ∨ -b^{27, 33}_1 ∨ -b^{27, 33}_0 ∨ false 
c  in DIMACS:
-14732 -14733 -14734  0

c i = 34
c  -2+1 --> -1
c    ( b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧  p_918) -> ( b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0)
c  in CNF:
c    -b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨  b^{27, 35}_2
c    -b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_1
c    -b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨  b^{27, 35}_0
c  in DIMACS:
-14735 -14736  14737 -918  14738 0
-14735 -14736  14737 -918 -14739 0
-14735 -14736  14737 -918  14740 0

c  -1+1 --> 0
c    ( b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0 ∧  p_918) -> (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧ -b^{27, 35}_0)
c  in CNF:
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_2
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_1
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_0
c  in DIMACS:
-14735  14736 -14737 -918 -14738 0
-14735  14736 -14737 -918 -14739 0
-14735  14736 -14737 -918 -14740 0

c  0+1 --> 1
c    (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧  p_918) -> (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0)
c  in CNF:
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_2
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_1
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨  b^{27, 35}_0
c  in DIMACS:
 14735  14736  14737 -918 -14738 0
 14735  14736  14737 -918 -14739 0
 14735  14736  14737 -918  14740 0

c  1+1 --> 2
c    (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0 ∧  p_918) -> (-b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0)
c  in CNF:
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_2
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨  b^{27, 35}_1
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ -p_918 ∨ -b^{27, 35}_0
c  in DIMACS:
 14735  14736 -14737 -918 -14738 0
 14735  14736 -14737 -918  14739 0
 14735  14736 -14737 -918 -14740 0

c  2+1 --> break 
c    (-b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧  p_918) -> break
c  in CNF:
c     b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 14735 -14736  14737 -918 1162 0


c  2-1 --> 1
c    (-b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧ -p_918) -> (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0)
c  in CNF:
c     b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_2
c     b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_1
c     b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨  b^{27, 35}_0
c  in DIMACS:
 14735 -14736  14737  918 -14738 0
 14735 -14736  14737  918 -14739 0
 14735 -14736  14737  918  14740 0

c  1-1 --> 0
c    (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0 ∧ -p_918) -> (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧ -b^{27, 35}_0)
c  in CNF:
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_2
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_1
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_0
c  in DIMACS:
 14735  14736 -14737  918 -14738 0
 14735  14736 -14737  918 -14739 0
 14735  14736 -14737  918 -14740 0

c  0-1 --> -1
c    (-b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧ -p_918) -> ( b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0)
c  in CNF:
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨  b^{27, 35}_2
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_1
c     b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨  b^{27, 35}_0
c  in DIMACS:
 14735  14736  14737  918  14738 0
 14735  14736  14737  918 -14739 0
 14735  14736  14737  918  14740 0

c  -1-1 --> -2
c    ( b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧  b^{27, 34}_0 ∧ -p_918) -> ( b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0)
c  in CNF:
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨  b^{27, 35}_2
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨  b^{27, 35}_1
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨  p_918 ∨ -b^{27, 35}_0
c  in DIMACS:
-14735  14736 -14737  918  14738 0
-14735  14736 -14737  918  14739 0
-14735  14736 -14737  918 -14740 0

c  -2-1 --> break 
c    ( b^{27, 34}_2 ∧  b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨  b^{27, 34}_0 ∨  p_918 ∨ break
c  in DIMACS:
-14735 -14736  14737  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 34}_2 ∧ -b^{27, 34}_1 ∧ -b^{27, 34}_0 ∧ true) 
c  in CNF:
c    -b^{27, 34}_2 ∨  b^{27, 34}_1 ∨  b^{27, 34}_0 ∨ false 
c  in DIMACS:
-14735  14736  14737  0

c  3 does not represent an automaton state.
c    -(-b^{27, 34}_2 ∧  b^{27, 34}_1 ∧  b^{27, 34}_0 ∧ true) 
c  in CNF:
c     b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ false 
c  in DIMACS:
 14735 -14736 -14737  0
c  -3 does not represent an automaton state.
c    -( b^{27, 34}_2 ∧  b^{27, 34}_1 ∧  b^{27, 34}_0 ∧ true) 
c  in CNF:
c    -b^{27, 34}_2 ∨ -b^{27, 34}_1 ∨ -b^{27, 34}_0 ∨ false 
c  in DIMACS:
-14735 -14736 -14737  0

c i = 35
c  -2+1 --> -1
c    ( b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧  p_945) -> ( b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0)
c  in CNF:
c    -b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨  b^{27, 36}_2
c    -b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_1
c    -b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨  b^{27, 36}_0
c  in DIMACS:
-14738 -14739  14740 -945  14741 0
-14738 -14739  14740 -945 -14742 0
-14738 -14739  14740 -945  14743 0

c  -1+1 --> 0
c    ( b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0 ∧  p_945) -> (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧ -b^{27, 36}_0)
c  in CNF:
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_2
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_1
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_0
c  in DIMACS:
-14738  14739 -14740 -945 -14741 0
-14738  14739 -14740 -945 -14742 0
-14738  14739 -14740 -945 -14743 0

c  0+1 --> 1
c    (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧  p_945) -> (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0)
c  in CNF:
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_2
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_1
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨  b^{27, 36}_0
c  in DIMACS:
 14738  14739  14740 -945 -14741 0
 14738  14739  14740 -945 -14742 0
 14738  14739  14740 -945  14743 0

c  1+1 --> 2
c    (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0 ∧  p_945) -> (-b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0)
c  in CNF:
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_2
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨  b^{27, 36}_1
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ -p_945 ∨ -b^{27, 36}_0
c  in DIMACS:
 14738  14739 -14740 -945 -14741 0
 14738  14739 -14740 -945  14742 0
 14738  14739 -14740 -945 -14743 0

c  2+1 --> break 
c    (-b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧  p_945) -> break
c  in CNF:
c     b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 14738 -14739  14740 -945 1162 0


c  2-1 --> 1
c    (-b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧ -p_945) -> (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0)
c  in CNF:
c     b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_2
c     b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_1
c     b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨  b^{27, 36}_0
c  in DIMACS:
 14738 -14739  14740  945 -14741 0
 14738 -14739  14740  945 -14742 0
 14738 -14739  14740  945  14743 0

c  1-1 --> 0
c    (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0 ∧ -p_945) -> (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧ -b^{27, 36}_0)
c  in CNF:
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_2
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_1
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_0
c  in DIMACS:
 14738  14739 -14740  945 -14741 0
 14738  14739 -14740  945 -14742 0
 14738  14739 -14740  945 -14743 0

c  0-1 --> -1
c    (-b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧ -p_945) -> ( b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0)
c  in CNF:
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨  b^{27, 36}_2
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_1
c     b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨  b^{27, 36}_0
c  in DIMACS:
 14738  14739  14740  945  14741 0
 14738  14739  14740  945 -14742 0
 14738  14739  14740  945  14743 0

c  -1-1 --> -2
c    ( b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧  b^{27, 35}_0 ∧ -p_945) -> ( b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0)
c  in CNF:
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨  b^{27, 36}_2
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨  b^{27, 36}_1
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨  p_945 ∨ -b^{27, 36}_0
c  in DIMACS:
-14738  14739 -14740  945  14741 0
-14738  14739 -14740  945  14742 0
-14738  14739 -14740  945 -14743 0

c  -2-1 --> break 
c    ( b^{27, 35}_2 ∧  b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨  b^{27, 35}_0 ∨  p_945 ∨ break
c  in DIMACS:
-14738 -14739  14740  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 35}_2 ∧ -b^{27, 35}_1 ∧ -b^{27, 35}_0 ∧ true) 
c  in CNF:
c    -b^{27, 35}_2 ∨  b^{27, 35}_1 ∨  b^{27, 35}_0 ∨ false 
c  in DIMACS:
-14738  14739  14740  0

c  3 does not represent an automaton state.
c    -(-b^{27, 35}_2 ∧  b^{27, 35}_1 ∧  b^{27, 35}_0 ∧ true) 
c  in CNF:
c     b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ false 
c  in DIMACS:
 14738 -14739 -14740  0
c  -3 does not represent an automaton state.
c    -( b^{27, 35}_2 ∧  b^{27, 35}_1 ∧  b^{27, 35}_0 ∧ true) 
c  in CNF:
c    -b^{27, 35}_2 ∨ -b^{27, 35}_1 ∨ -b^{27, 35}_0 ∨ false 
c  in DIMACS:
-14738 -14739 -14740  0

c i = 36
c  -2+1 --> -1
c    ( b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧  p_972) -> ( b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0)
c  in CNF:
c    -b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨  b^{27, 37}_2
c    -b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_1
c    -b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨  b^{27, 37}_0
c  in DIMACS:
-14741 -14742  14743 -972  14744 0
-14741 -14742  14743 -972 -14745 0
-14741 -14742  14743 -972  14746 0

c  -1+1 --> 0
c    ( b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0 ∧  p_972) -> (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧ -b^{27, 37}_0)
c  in CNF:
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_2
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_1
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_0
c  in DIMACS:
-14741  14742 -14743 -972 -14744 0
-14741  14742 -14743 -972 -14745 0
-14741  14742 -14743 -972 -14746 0

c  0+1 --> 1
c    (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧  p_972) -> (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0)
c  in CNF:
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_2
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_1
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨  b^{27, 37}_0
c  in DIMACS:
 14741  14742  14743 -972 -14744 0
 14741  14742  14743 -972 -14745 0
 14741  14742  14743 -972  14746 0

c  1+1 --> 2
c    (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0 ∧  p_972) -> (-b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0)
c  in CNF:
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_2
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨  b^{27, 37}_1
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ -p_972 ∨ -b^{27, 37}_0
c  in DIMACS:
 14741  14742 -14743 -972 -14744 0
 14741  14742 -14743 -972  14745 0
 14741  14742 -14743 -972 -14746 0

c  2+1 --> break 
c    (-b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧  p_972) -> break
c  in CNF:
c     b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 14741 -14742  14743 -972 1162 0


c  2-1 --> 1
c    (-b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧ -p_972) -> (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0)
c  in CNF:
c     b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_2
c     b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_1
c     b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨  b^{27, 37}_0
c  in DIMACS:
 14741 -14742  14743  972 -14744 0
 14741 -14742  14743  972 -14745 0
 14741 -14742  14743  972  14746 0

c  1-1 --> 0
c    (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0 ∧ -p_972) -> (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧ -b^{27, 37}_0)
c  in CNF:
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_2
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_1
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_0
c  in DIMACS:
 14741  14742 -14743  972 -14744 0
 14741  14742 -14743  972 -14745 0
 14741  14742 -14743  972 -14746 0

c  0-1 --> -1
c    (-b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧ -p_972) -> ( b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0)
c  in CNF:
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨  b^{27, 37}_2
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_1
c     b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨  b^{27, 37}_0
c  in DIMACS:
 14741  14742  14743  972  14744 0
 14741  14742  14743  972 -14745 0
 14741  14742  14743  972  14746 0

c  -1-1 --> -2
c    ( b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧  b^{27, 36}_0 ∧ -p_972) -> ( b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0)
c  in CNF:
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨  b^{27, 37}_2
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨  b^{27, 37}_1
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨  p_972 ∨ -b^{27, 37}_0
c  in DIMACS:
-14741  14742 -14743  972  14744 0
-14741  14742 -14743  972  14745 0
-14741  14742 -14743  972 -14746 0

c  -2-1 --> break 
c    ( b^{27, 36}_2 ∧  b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨  b^{27, 36}_0 ∨  p_972 ∨ break
c  in DIMACS:
-14741 -14742  14743  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 36}_2 ∧ -b^{27, 36}_1 ∧ -b^{27, 36}_0 ∧ true) 
c  in CNF:
c    -b^{27, 36}_2 ∨  b^{27, 36}_1 ∨  b^{27, 36}_0 ∨ false 
c  in DIMACS:
-14741  14742  14743  0

c  3 does not represent an automaton state.
c    -(-b^{27, 36}_2 ∧  b^{27, 36}_1 ∧  b^{27, 36}_0 ∧ true) 
c  in CNF:
c     b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ false 
c  in DIMACS:
 14741 -14742 -14743  0
c  -3 does not represent an automaton state.
c    -( b^{27, 36}_2 ∧  b^{27, 36}_1 ∧  b^{27, 36}_0 ∧ true) 
c  in CNF:
c    -b^{27, 36}_2 ∨ -b^{27, 36}_1 ∨ -b^{27, 36}_0 ∨ false 
c  in DIMACS:
-14741 -14742 -14743  0

c i = 37
c  -2+1 --> -1
c    ( b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧  p_999) -> ( b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0)
c  in CNF:
c    -b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨  b^{27, 38}_2
c    -b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_1
c    -b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨  b^{27, 38}_0
c  in DIMACS:
-14744 -14745  14746 -999  14747 0
-14744 -14745  14746 -999 -14748 0
-14744 -14745  14746 -999  14749 0

c  -1+1 --> 0
c    ( b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0 ∧  p_999) -> (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧ -b^{27, 38}_0)
c  in CNF:
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_2
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_1
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_0
c  in DIMACS:
-14744  14745 -14746 -999 -14747 0
-14744  14745 -14746 -999 -14748 0
-14744  14745 -14746 -999 -14749 0

c  0+1 --> 1
c    (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧  p_999) -> (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0)
c  in CNF:
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_2
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_1
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨  b^{27, 38}_0
c  in DIMACS:
 14744  14745  14746 -999 -14747 0
 14744  14745  14746 -999 -14748 0
 14744  14745  14746 -999  14749 0

c  1+1 --> 2
c    (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0 ∧  p_999) -> (-b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0)
c  in CNF:
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_2
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨  b^{27, 38}_1
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ -p_999 ∨ -b^{27, 38}_0
c  in DIMACS:
 14744  14745 -14746 -999 -14747 0
 14744  14745 -14746 -999  14748 0
 14744  14745 -14746 -999 -14749 0

c  2+1 --> break 
c    (-b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧  p_999) -> break
c  in CNF:
c     b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 14744 -14745  14746 -999 1162 0


c  2-1 --> 1
c    (-b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧ -p_999) -> (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0)
c  in CNF:
c     b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_2
c     b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_1
c     b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨  b^{27, 38}_0
c  in DIMACS:
 14744 -14745  14746  999 -14747 0
 14744 -14745  14746  999 -14748 0
 14744 -14745  14746  999  14749 0

c  1-1 --> 0
c    (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0 ∧ -p_999) -> (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧ -b^{27, 38}_0)
c  in CNF:
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_2
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_1
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_0
c  in DIMACS:
 14744  14745 -14746  999 -14747 0
 14744  14745 -14746  999 -14748 0
 14744  14745 -14746  999 -14749 0

c  0-1 --> -1
c    (-b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧ -p_999) -> ( b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0)
c  in CNF:
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨  b^{27, 38}_2
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_1
c     b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨  b^{27, 38}_0
c  in DIMACS:
 14744  14745  14746  999  14747 0
 14744  14745  14746  999 -14748 0
 14744  14745  14746  999  14749 0

c  -1-1 --> -2
c    ( b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧  b^{27, 37}_0 ∧ -p_999) -> ( b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0)
c  in CNF:
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨  b^{27, 38}_2
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨  b^{27, 38}_1
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨  p_999 ∨ -b^{27, 38}_0
c  in DIMACS:
-14744  14745 -14746  999  14747 0
-14744  14745 -14746  999  14748 0
-14744  14745 -14746  999 -14749 0

c  -2-1 --> break 
c    ( b^{27, 37}_2 ∧  b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨  b^{27, 37}_0 ∨  p_999 ∨ break
c  in DIMACS:
-14744 -14745  14746  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 37}_2 ∧ -b^{27, 37}_1 ∧ -b^{27, 37}_0 ∧ true) 
c  in CNF:
c    -b^{27, 37}_2 ∨  b^{27, 37}_1 ∨  b^{27, 37}_0 ∨ false 
c  in DIMACS:
-14744  14745  14746  0

c  3 does not represent an automaton state.
c    -(-b^{27, 37}_2 ∧  b^{27, 37}_1 ∧  b^{27, 37}_0 ∧ true) 
c  in CNF:
c     b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ false 
c  in DIMACS:
 14744 -14745 -14746  0
c  -3 does not represent an automaton state.
c    -( b^{27, 37}_2 ∧  b^{27, 37}_1 ∧  b^{27, 37}_0 ∧ true) 
c  in CNF:
c    -b^{27, 37}_2 ∨ -b^{27, 37}_1 ∨ -b^{27, 37}_0 ∨ false 
c  in DIMACS:
-14744 -14745 -14746  0

c i = 38
c  -2+1 --> -1
c    ( b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧  p_1026) -> ( b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0)
c  in CNF:
c    -b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨  b^{27, 39}_2
c    -b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_1
c    -b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨  b^{27, 39}_0
c  in DIMACS:
-14747 -14748  14749 -1026  14750 0
-14747 -14748  14749 -1026 -14751 0
-14747 -14748  14749 -1026  14752 0

c  -1+1 --> 0
c    ( b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0 ∧  p_1026) -> (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧ -b^{27, 39}_0)
c  in CNF:
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_2
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_1
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_0
c  in DIMACS:
-14747  14748 -14749 -1026 -14750 0
-14747  14748 -14749 -1026 -14751 0
-14747  14748 -14749 -1026 -14752 0

c  0+1 --> 1
c    (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧  p_1026) -> (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0)
c  in CNF:
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_2
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_1
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨  b^{27, 39}_0
c  in DIMACS:
 14747  14748  14749 -1026 -14750 0
 14747  14748  14749 -1026 -14751 0
 14747  14748  14749 -1026  14752 0

c  1+1 --> 2
c    (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0 ∧  p_1026) -> (-b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0)
c  in CNF:
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_2
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨  b^{27, 39}_1
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ -p_1026 ∨ -b^{27, 39}_0
c  in DIMACS:
 14747  14748 -14749 -1026 -14750 0
 14747  14748 -14749 -1026  14751 0
 14747  14748 -14749 -1026 -14752 0

c  2+1 --> break 
c    (-b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 14747 -14748  14749 -1026 1162 0


c  2-1 --> 1
c    (-b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧ -p_1026) -> (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0)
c  in CNF:
c     b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_2
c     b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_1
c     b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨  b^{27, 39}_0
c  in DIMACS:
 14747 -14748  14749  1026 -14750 0
 14747 -14748  14749  1026 -14751 0
 14747 -14748  14749  1026  14752 0

c  1-1 --> 0
c    (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0 ∧ -p_1026) -> (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧ -b^{27, 39}_0)
c  in CNF:
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_2
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_1
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_0
c  in DIMACS:
 14747  14748 -14749  1026 -14750 0
 14747  14748 -14749  1026 -14751 0
 14747  14748 -14749  1026 -14752 0

c  0-1 --> -1
c    (-b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧ -p_1026) -> ( b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0)
c  in CNF:
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨  b^{27, 39}_2
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_1
c     b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨  b^{27, 39}_0
c  in DIMACS:
 14747  14748  14749  1026  14750 0
 14747  14748  14749  1026 -14751 0
 14747  14748  14749  1026  14752 0

c  -1-1 --> -2
c    ( b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧  b^{27, 38}_0 ∧ -p_1026) -> ( b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0)
c  in CNF:
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨  b^{27, 39}_2
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨  b^{27, 39}_1
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨  p_1026 ∨ -b^{27, 39}_0
c  in DIMACS:
-14747  14748 -14749  1026  14750 0
-14747  14748 -14749  1026  14751 0
-14747  14748 -14749  1026 -14752 0

c  -2-1 --> break 
c    ( b^{27, 38}_2 ∧  b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨  b^{27, 38}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-14747 -14748  14749  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 38}_2 ∧ -b^{27, 38}_1 ∧ -b^{27, 38}_0 ∧ true) 
c  in CNF:
c    -b^{27, 38}_2 ∨  b^{27, 38}_1 ∨  b^{27, 38}_0 ∨ false 
c  in DIMACS:
-14747  14748  14749  0

c  3 does not represent an automaton state.
c    -(-b^{27, 38}_2 ∧  b^{27, 38}_1 ∧  b^{27, 38}_0 ∧ true) 
c  in CNF:
c     b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ false 
c  in DIMACS:
 14747 -14748 -14749  0
c  -3 does not represent an automaton state.
c    -( b^{27, 38}_2 ∧  b^{27, 38}_1 ∧  b^{27, 38}_0 ∧ true) 
c  in CNF:
c    -b^{27, 38}_2 ∨ -b^{27, 38}_1 ∨ -b^{27, 38}_0 ∨ false 
c  in DIMACS:
-14747 -14748 -14749  0

c i = 39
c  -2+1 --> -1
c    ( b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧  p_1053) -> ( b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0)
c  in CNF:
c    -b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨  b^{27, 40}_2
c    -b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_1
c    -b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨  b^{27, 40}_0
c  in DIMACS:
-14750 -14751  14752 -1053  14753 0
-14750 -14751  14752 -1053 -14754 0
-14750 -14751  14752 -1053  14755 0

c  -1+1 --> 0
c    ( b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0 ∧  p_1053) -> (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧ -b^{27, 40}_0)
c  in CNF:
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_2
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_1
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_0
c  in DIMACS:
-14750  14751 -14752 -1053 -14753 0
-14750  14751 -14752 -1053 -14754 0
-14750  14751 -14752 -1053 -14755 0

c  0+1 --> 1
c    (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧  p_1053) -> (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0)
c  in CNF:
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_2
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_1
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨  b^{27, 40}_0
c  in DIMACS:
 14750  14751  14752 -1053 -14753 0
 14750  14751  14752 -1053 -14754 0
 14750  14751  14752 -1053  14755 0

c  1+1 --> 2
c    (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0 ∧  p_1053) -> (-b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0)
c  in CNF:
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_2
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨  b^{27, 40}_1
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ -p_1053 ∨ -b^{27, 40}_0
c  in DIMACS:
 14750  14751 -14752 -1053 -14753 0
 14750  14751 -14752 -1053  14754 0
 14750  14751 -14752 -1053 -14755 0

c  2+1 --> break 
c    (-b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 14750 -14751  14752 -1053 1162 0


c  2-1 --> 1
c    (-b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧ -p_1053) -> (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0)
c  in CNF:
c     b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_2
c     b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_1
c     b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨  b^{27, 40}_0
c  in DIMACS:
 14750 -14751  14752  1053 -14753 0
 14750 -14751  14752  1053 -14754 0
 14750 -14751  14752  1053  14755 0

c  1-1 --> 0
c    (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0 ∧ -p_1053) -> (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧ -b^{27, 40}_0)
c  in CNF:
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_2
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_1
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_0
c  in DIMACS:
 14750  14751 -14752  1053 -14753 0
 14750  14751 -14752  1053 -14754 0
 14750  14751 -14752  1053 -14755 0

c  0-1 --> -1
c    (-b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧ -p_1053) -> ( b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0)
c  in CNF:
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨  b^{27, 40}_2
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_1
c     b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨  b^{27, 40}_0
c  in DIMACS:
 14750  14751  14752  1053  14753 0
 14750  14751  14752  1053 -14754 0
 14750  14751  14752  1053  14755 0

c  -1-1 --> -2
c    ( b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧  b^{27, 39}_0 ∧ -p_1053) -> ( b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0)
c  in CNF:
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨  b^{27, 40}_2
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨  b^{27, 40}_1
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨  p_1053 ∨ -b^{27, 40}_0
c  in DIMACS:
-14750  14751 -14752  1053  14753 0
-14750  14751 -14752  1053  14754 0
-14750  14751 -14752  1053 -14755 0

c  -2-1 --> break 
c    ( b^{27, 39}_2 ∧  b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨  b^{27, 39}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-14750 -14751  14752  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 39}_2 ∧ -b^{27, 39}_1 ∧ -b^{27, 39}_0 ∧ true) 
c  in CNF:
c    -b^{27, 39}_2 ∨  b^{27, 39}_1 ∨  b^{27, 39}_0 ∨ false 
c  in DIMACS:
-14750  14751  14752  0

c  3 does not represent an automaton state.
c    -(-b^{27, 39}_2 ∧  b^{27, 39}_1 ∧  b^{27, 39}_0 ∧ true) 
c  in CNF:
c     b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ false 
c  in DIMACS:
 14750 -14751 -14752  0
c  -3 does not represent an automaton state.
c    -( b^{27, 39}_2 ∧  b^{27, 39}_1 ∧  b^{27, 39}_0 ∧ true) 
c  in CNF:
c    -b^{27, 39}_2 ∨ -b^{27, 39}_1 ∨ -b^{27, 39}_0 ∨ false 
c  in DIMACS:
-14750 -14751 -14752  0

c i = 40
c  -2+1 --> -1
c    ( b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧  p_1080) -> ( b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0)
c  in CNF:
c    -b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨  b^{27, 41}_2
c    -b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_1
c    -b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨  b^{27, 41}_0
c  in DIMACS:
-14753 -14754  14755 -1080  14756 0
-14753 -14754  14755 -1080 -14757 0
-14753 -14754  14755 -1080  14758 0

c  -1+1 --> 0
c    ( b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0 ∧  p_1080) -> (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧ -b^{27, 41}_0)
c  in CNF:
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_2
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_1
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_0
c  in DIMACS:
-14753  14754 -14755 -1080 -14756 0
-14753  14754 -14755 -1080 -14757 0
-14753  14754 -14755 -1080 -14758 0

c  0+1 --> 1
c    (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧  p_1080) -> (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0)
c  in CNF:
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_2
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_1
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨  b^{27, 41}_0
c  in DIMACS:
 14753  14754  14755 -1080 -14756 0
 14753  14754  14755 -1080 -14757 0
 14753  14754  14755 -1080  14758 0

c  1+1 --> 2
c    (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0 ∧  p_1080) -> (-b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0)
c  in CNF:
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_2
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨  b^{27, 41}_1
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ -p_1080 ∨ -b^{27, 41}_0
c  in DIMACS:
 14753  14754 -14755 -1080 -14756 0
 14753  14754 -14755 -1080  14757 0
 14753  14754 -14755 -1080 -14758 0

c  2+1 --> break 
c    (-b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 14753 -14754  14755 -1080 1162 0


c  2-1 --> 1
c    (-b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧ -p_1080) -> (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0)
c  in CNF:
c     b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_2
c     b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_1
c     b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨  b^{27, 41}_0
c  in DIMACS:
 14753 -14754  14755  1080 -14756 0
 14753 -14754  14755  1080 -14757 0
 14753 -14754  14755  1080  14758 0

c  1-1 --> 0
c    (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0 ∧ -p_1080) -> (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧ -b^{27, 41}_0)
c  in CNF:
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_2
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_1
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_0
c  in DIMACS:
 14753  14754 -14755  1080 -14756 0
 14753  14754 -14755  1080 -14757 0
 14753  14754 -14755  1080 -14758 0

c  0-1 --> -1
c    (-b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧ -p_1080) -> ( b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0)
c  in CNF:
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨  b^{27, 41}_2
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_1
c     b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨  b^{27, 41}_0
c  in DIMACS:
 14753  14754  14755  1080  14756 0
 14753  14754  14755  1080 -14757 0
 14753  14754  14755  1080  14758 0

c  -1-1 --> -2
c    ( b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧  b^{27, 40}_0 ∧ -p_1080) -> ( b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0)
c  in CNF:
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨  b^{27, 41}_2
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨  b^{27, 41}_1
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨  p_1080 ∨ -b^{27, 41}_0
c  in DIMACS:
-14753  14754 -14755  1080  14756 0
-14753  14754 -14755  1080  14757 0
-14753  14754 -14755  1080 -14758 0

c  -2-1 --> break 
c    ( b^{27, 40}_2 ∧  b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨  b^{27, 40}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-14753 -14754  14755  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 40}_2 ∧ -b^{27, 40}_1 ∧ -b^{27, 40}_0 ∧ true) 
c  in CNF:
c    -b^{27, 40}_2 ∨  b^{27, 40}_1 ∨  b^{27, 40}_0 ∨ false 
c  in DIMACS:
-14753  14754  14755  0

c  3 does not represent an automaton state.
c    -(-b^{27, 40}_2 ∧  b^{27, 40}_1 ∧  b^{27, 40}_0 ∧ true) 
c  in CNF:
c     b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ false 
c  in DIMACS:
 14753 -14754 -14755  0
c  -3 does not represent an automaton state.
c    -( b^{27, 40}_2 ∧  b^{27, 40}_1 ∧  b^{27, 40}_0 ∧ true) 
c  in CNF:
c    -b^{27, 40}_2 ∨ -b^{27, 40}_1 ∨ -b^{27, 40}_0 ∨ false 
c  in DIMACS:
-14753 -14754 -14755  0

c i = 41
c  -2+1 --> -1
c    ( b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧  p_1107) -> ( b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0)
c  in CNF:
c    -b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨  b^{27, 42}_2
c    -b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_1
c    -b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨  b^{27, 42}_0
c  in DIMACS:
-14756 -14757  14758 -1107  14759 0
-14756 -14757  14758 -1107 -14760 0
-14756 -14757  14758 -1107  14761 0

c  -1+1 --> 0
c    ( b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0 ∧  p_1107) -> (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧ -b^{27, 42}_0)
c  in CNF:
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_2
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_1
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_0
c  in DIMACS:
-14756  14757 -14758 -1107 -14759 0
-14756  14757 -14758 -1107 -14760 0
-14756  14757 -14758 -1107 -14761 0

c  0+1 --> 1
c    (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧  p_1107) -> (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0)
c  in CNF:
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_2
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_1
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨  b^{27, 42}_0
c  in DIMACS:
 14756  14757  14758 -1107 -14759 0
 14756  14757  14758 -1107 -14760 0
 14756  14757  14758 -1107  14761 0

c  1+1 --> 2
c    (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0 ∧  p_1107) -> (-b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0)
c  in CNF:
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_2
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨  b^{27, 42}_1
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ -p_1107 ∨ -b^{27, 42}_0
c  in DIMACS:
 14756  14757 -14758 -1107 -14759 0
 14756  14757 -14758 -1107  14760 0
 14756  14757 -14758 -1107 -14761 0

c  2+1 --> break 
c    (-b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 14756 -14757  14758 -1107 1162 0


c  2-1 --> 1
c    (-b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧ -p_1107) -> (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0)
c  in CNF:
c     b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_2
c     b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_1
c     b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨  b^{27, 42}_0
c  in DIMACS:
 14756 -14757  14758  1107 -14759 0
 14756 -14757  14758  1107 -14760 0
 14756 -14757  14758  1107  14761 0

c  1-1 --> 0
c    (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0 ∧ -p_1107) -> (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧ -b^{27, 42}_0)
c  in CNF:
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_2
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_1
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_0
c  in DIMACS:
 14756  14757 -14758  1107 -14759 0
 14756  14757 -14758  1107 -14760 0
 14756  14757 -14758  1107 -14761 0

c  0-1 --> -1
c    (-b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧ -p_1107) -> ( b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0)
c  in CNF:
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨  b^{27, 42}_2
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_1
c     b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨  b^{27, 42}_0
c  in DIMACS:
 14756  14757  14758  1107  14759 0
 14756  14757  14758  1107 -14760 0
 14756  14757  14758  1107  14761 0

c  -1-1 --> -2
c    ( b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧  b^{27, 41}_0 ∧ -p_1107) -> ( b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0)
c  in CNF:
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨  b^{27, 42}_2
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨  b^{27, 42}_1
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨  p_1107 ∨ -b^{27, 42}_0
c  in DIMACS:
-14756  14757 -14758  1107  14759 0
-14756  14757 -14758  1107  14760 0
-14756  14757 -14758  1107 -14761 0

c  -2-1 --> break 
c    ( b^{27, 41}_2 ∧  b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨  b^{27, 41}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-14756 -14757  14758  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 41}_2 ∧ -b^{27, 41}_1 ∧ -b^{27, 41}_0 ∧ true) 
c  in CNF:
c    -b^{27, 41}_2 ∨  b^{27, 41}_1 ∨  b^{27, 41}_0 ∨ false 
c  in DIMACS:
-14756  14757  14758  0

c  3 does not represent an automaton state.
c    -(-b^{27, 41}_2 ∧  b^{27, 41}_1 ∧  b^{27, 41}_0 ∧ true) 
c  in CNF:
c     b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ false 
c  in DIMACS:
 14756 -14757 -14758  0
c  -3 does not represent an automaton state.
c    -( b^{27, 41}_2 ∧  b^{27, 41}_1 ∧  b^{27, 41}_0 ∧ true) 
c  in CNF:
c    -b^{27, 41}_2 ∨ -b^{27, 41}_1 ∨ -b^{27, 41}_0 ∨ false 
c  in DIMACS:
-14756 -14757 -14758  0

c i = 42
c  -2+1 --> -1
c    ( b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧  p_1134) -> ( b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0)
c  in CNF:
c    -b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨  b^{27, 43}_2
c    -b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_1
c    -b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨  b^{27, 43}_0
c  in DIMACS:
-14759 -14760  14761 -1134  14762 0
-14759 -14760  14761 -1134 -14763 0
-14759 -14760  14761 -1134  14764 0

c  -1+1 --> 0
c    ( b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0 ∧  p_1134) -> (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧ -b^{27, 43}_0)
c  in CNF:
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_2
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_1
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_0
c  in DIMACS:
-14759  14760 -14761 -1134 -14762 0
-14759  14760 -14761 -1134 -14763 0
-14759  14760 -14761 -1134 -14764 0

c  0+1 --> 1
c    (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧  p_1134) -> (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0)
c  in CNF:
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_2
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_1
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨  b^{27, 43}_0
c  in DIMACS:
 14759  14760  14761 -1134 -14762 0
 14759  14760  14761 -1134 -14763 0
 14759  14760  14761 -1134  14764 0

c  1+1 --> 2
c    (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0 ∧  p_1134) -> (-b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0)
c  in CNF:
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_2
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨  b^{27, 43}_1
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ -p_1134 ∨ -b^{27, 43}_0
c  in DIMACS:
 14759  14760 -14761 -1134 -14762 0
 14759  14760 -14761 -1134  14763 0
 14759  14760 -14761 -1134 -14764 0

c  2+1 --> break 
c    (-b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 14759 -14760  14761 -1134 1162 0


c  2-1 --> 1
c    (-b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧ -p_1134) -> (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0)
c  in CNF:
c     b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_2
c     b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_1
c     b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨  b^{27, 43}_0
c  in DIMACS:
 14759 -14760  14761  1134 -14762 0
 14759 -14760  14761  1134 -14763 0
 14759 -14760  14761  1134  14764 0

c  1-1 --> 0
c    (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0 ∧ -p_1134) -> (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧ -b^{27, 43}_0)
c  in CNF:
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_2
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_1
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_0
c  in DIMACS:
 14759  14760 -14761  1134 -14762 0
 14759  14760 -14761  1134 -14763 0
 14759  14760 -14761  1134 -14764 0

c  0-1 --> -1
c    (-b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧ -p_1134) -> ( b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0)
c  in CNF:
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨  b^{27, 43}_2
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_1
c     b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨  b^{27, 43}_0
c  in DIMACS:
 14759  14760  14761  1134  14762 0
 14759  14760  14761  1134 -14763 0
 14759  14760  14761  1134  14764 0

c  -1-1 --> -2
c    ( b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧  b^{27, 42}_0 ∧ -p_1134) -> ( b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0)
c  in CNF:
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨  b^{27, 43}_2
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨  b^{27, 43}_1
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨  p_1134 ∨ -b^{27, 43}_0
c  in DIMACS:
-14759  14760 -14761  1134  14762 0
-14759  14760 -14761  1134  14763 0
-14759  14760 -14761  1134 -14764 0

c  -2-1 --> break 
c    ( b^{27, 42}_2 ∧  b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨  b^{27, 42}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-14759 -14760  14761  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 42}_2 ∧ -b^{27, 42}_1 ∧ -b^{27, 42}_0 ∧ true) 
c  in CNF:
c    -b^{27, 42}_2 ∨  b^{27, 42}_1 ∨  b^{27, 42}_0 ∨ false 
c  in DIMACS:
-14759  14760  14761  0

c  3 does not represent an automaton state.
c    -(-b^{27, 42}_2 ∧  b^{27, 42}_1 ∧  b^{27, 42}_0 ∧ true) 
c  in CNF:
c     b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ false 
c  in DIMACS:
 14759 -14760 -14761  0
c  -3 does not represent an automaton state.
c    -( b^{27, 42}_2 ∧  b^{27, 42}_1 ∧  b^{27, 42}_0 ∧ true) 
c  in CNF:
c    -b^{27, 42}_2 ∨ -b^{27, 42}_1 ∨ -b^{27, 42}_0 ∨ false 
c  in DIMACS:
-14759 -14760 -14761  0

c i = 43
c  -2+1 --> -1
c    ( b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧  p_1161) -> ( b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧  b^{27, 44}_0)
c  in CNF:
c    -b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨  b^{27, 44}_2
c    -b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_1
c    -b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨  b^{27, 44}_0
c  in DIMACS:
-14762 -14763  14764 -1161  14765 0
-14762 -14763  14764 -1161 -14766 0
-14762 -14763  14764 -1161  14767 0

c  -1+1 --> 0
c    ( b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0 ∧  p_1161) -> (-b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧ -b^{27, 44}_0)
c  in CNF:
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_2
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_1
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_0
c  in DIMACS:
-14762  14763 -14764 -1161 -14765 0
-14762  14763 -14764 -1161 -14766 0
-14762  14763 -14764 -1161 -14767 0

c  0+1 --> 1
c    (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧  p_1161) -> (-b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧  b^{27, 44}_0)
c  in CNF:
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_2
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_1
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨  b^{27, 44}_0
c  in DIMACS:
 14762  14763  14764 -1161 -14765 0
 14762  14763  14764 -1161 -14766 0
 14762  14763  14764 -1161  14767 0

c  1+1 --> 2
c    (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0 ∧  p_1161) -> (-b^{27, 44}_2 ∧  b^{27, 44}_1 ∧ -b^{27, 44}_0)
c  in CNF:
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_2
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨  b^{27, 44}_1
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ -p_1161 ∨ -b^{27, 44}_0
c  in DIMACS:
 14762  14763 -14764 -1161 -14765 0
 14762  14763 -14764 -1161  14766 0
 14762  14763 -14764 -1161 -14767 0

c  2+1 --> break 
c    (-b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 14762 -14763  14764 -1161 1162 0


c  2-1 --> 1
c    (-b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧ -p_1161) -> (-b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧  b^{27, 44}_0)
c  in CNF:
c     b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_2
c     b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_1
c     b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨  b^{27, 44}_0
c  in DIMACS:
 14762 -14763  14764  1161 -14765 0
 14762 -14763  14764  1161 -14766 0
 14762 -14763  14764  1161  14767 0

c  1-1 --> 0
c    (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0 ∧ -p_1161) -> (-b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧ -b^{27, 44}_0)
c  in CNF:
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_2
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_1
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_0
c  in DIMACS:
 14762  14763 -14764  1161 -14765 0
 14762  14763 -14764  1161 -14766 0
 14762  14763 -14764  1161 -14767 0

c  0-1 --> -1
c    (-b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧ -p_1161) -> ( b^{27, 44}_2 ∧ -b^{27, 44}_1 ∧  b^{27, 44}_0)
c  in CNF:
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨  b^{27, 44}_2
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_1
c     b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨  b^{27, 44}_0
c  in DIMACS:
 14762  14763  14764  1161  14765 0
 14762  14763  14764  1161 -14766 0
 14762  14763  14764  1161  14767 0

c  -1-1 --> -2
c    ( b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧  b^{27, 43}_0 ∧ -p_1161) -> ( b^{27, 44}_2 ∧  b^{27, 44}_1 ∧ -b^{27, 44}_0)
c  in CNF:
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨  b^{27, 44}_2
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨  b^{27, 44}_1
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨  p_1161 ∨ -b^{27, 44}_0
c  in DIMACS:
-14762  14763 -14764  1161  14765 0
-14762  14763 -14764  1161  14766 0
-14762  14763 -14764  1161 -14767 0

c  -2-1 --> break 
c    ( b^{27, 43}_2 ∧  b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨  b^{27, 43}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-14762 -14763  14764  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{27, 43}_2 ∧ -b^{27, 43}_1 ∧ -b^{27, 43}_0 ∧ true) 
c  in CNF:
c    -b^{27, 43}_2 ∨  b^{27, 43}_1 ∨  b^{27, 43}_0 ∨ false 
c  in DIMACS:
-14762  14763  14764  0

c  3 does not represent an automaton state.
c    -(-b^{27, 43}_2 ∧  b^{27, 43}_1 ∧  b^{27, 43}_0 ∧ true) 
c  in CNF:
c     b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ false 
c  in DIMACS:
 14762 -14763 -14764  0
c  -3 does not represent an automaton state.
c    -( b^{27, 43}_2 ∧  b^{27, 43}_1 ∧  b^{27, 43}_0 ∧ true) 
c  in CNF:
c    -b^{27, 43}_2 ∨ -b^{27, 43}_1 ∨ -b^{27, 43}_0 ∨ false 
c  in DIMACS:
-14762 -14763 -14764  0

c INIT for k = 28
c    -b^{28, 1}_2
c    -b^{28, 1}_1
c    -b^{28, 1}_0
c  in DIMACS:
-14768 0
-14769 0
-14770 0

c Transitions for k = 28
c i = 1
c  -2+1 --> -1
c    ( b^{28, 1}_2 ∧  b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧  p_28) -> ( b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0)
c  in CNF:
c    -b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨  b^{28, 2}_2
c    -b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_1
c    -b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨  b^{28, 2}_0
c  in DIMACS:
-14768 -14769  14770 -28  14771 0
-14768 -14769  14770 -28 -14772 0
-14768 -14769  14770 -28  14773 0

c  -1+1 --> 0
c    ( b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧  b^{28, 1}_0 ∧  p_28) -> (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧ -b^{28, 2}_0)
c  in CNF:
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_2
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_1
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_0
c  in DIMACS:
-14768  14769 -14770 -28 -14771 0
-14768  14769 -14770 -28 -14772 0
-14768  14769 -14770 -28 -14773 0

c  0+1 --> 1
c    (-b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧  p_28) -> (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0)
c  in CNF:
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_2
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_1
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨  b^{28, 2}_0
c  in DIMACS:
 14768  14769  14770 -28 -14771 0
 14768  14769  14770 -28 -14772 0
 14768  14769  14770 -28  14773 0

c  1+1 --> 2
c    (-b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧  b^{28, 1}_0 ∧  p_28) -> (-b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0)
c  in CNF:
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_2
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨  b^{28, 2}_1
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ -p_28 ∨ -b^{28, 2}_0
c  in DIMACS:
 14768  14769 -14770 -28 -14771 0
 14768  14769 -14770 -28  14772 0
 14768  14769 -14770 -28 -14773 0

c  2+1 --> break 
c    (-b^{28, 1}_2 ∧  b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧  p_28) -> break
c  in CNF:
c     b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ -p_28 ∨ break
c  in DIMACS:
 14768 -14769  14770 -28 1162 0


c  2-1 --> 1
c    (-b^{28, 1}_2 ∧  b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧ -p_28) -> (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0)
c  in CNF:
c     b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_2
c     b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_1
c     b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨  b^{28, 2}_0
c  in DIMACS:
 14768 -14769  14770  28 -14771 0
 14768 -14769  14770  28 -14772 0
 14768 -14769  14770  28  14773 0

c  1-1 --> 0
c    (-b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧  b^{28, 1}_0 ∧ -p_28) -> (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧ -b^{28, 2}_0)
c  in CNF:
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_2
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_1
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_0
c  in DIMACS:
 14768  14769 -14770  28 -14771 0
 14768  14769 -14770  28 -14772 0
 14768  14769 -14770  28 -14773 0

c  0-1 --> -1
c    (-b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧ -p_28) -> ( b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0)
c  in CNF:
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨  b^{28, 2}_2
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_1
c     b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨  b^{28, 2}_0
c  in DIMACS:
 14768  14769  14770  28  14771 0
 14768  14769  14770  28 -14772 0
 14768  14769  14770  28  14773 0

c  -1-1 --> -2
c    ( b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧  b^{28, 1}_0 ∧ -p_28) -> ( b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0)
c  in CNF:
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨  b^{28, 2}_2
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨  b^{28, 2}_1
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨  p_28 ∨ -b^{28, 2}_0
c  in DIMACS:
-14768  14769 -14770  28  14771 0
-14768  14769 -14770  28  14772 0
-14768  14769 -14770  28 -14773 0

c  -2-1 --> break 
c    ( b^{28, 1}_2 ∧  b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧ -p_28) -> break
c  in CNF:
c    -b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨  b^{28, 1}_0 ∨  p_28 ∨ break
c  in DIMACS:
-14768 -14769  14770  28 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 1}_2 ∧ -b^{28, 1}_1 ∧ -b^{28, 1}_0 ∧ true) 
c  in CNF:
c    -b^{28, 1}_2 ∨  b^{28, 1}_1 ∨  b^{28, 1}_0 ∨ false 
c  in DIMACS:
-14768  14769  14770  0

c  3 does not represent an automaton state.
c    -(-b^{28, 1}_2 ∧  b^{28, 1}_1 ∧  b^{28, 1}_0 ∧ true) 
c  in CNF:
c     b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ false 
c  in DIMACS:
 14768 -14769 -14770  0
c  -3 does not represent an automaton state.
c    -( b^{28, 1}_2 ∧  b^{28, 1}_1 ∧  b^{28, 1}_0 ∧ true) 
c  in CNF:
c    -b^{28, 1}_2 ∨ -b^{28, 1}_1 ∨ -b^{28, 1}_0 ∨ false 
c  in DIMACS:
-14768 -14769 -14770  0

c i = 2
c  -2+1 --> -1
c    ( b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧  p_56) -> ( b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0)
c  in CNF:
c    -b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨  b^{28, 3}_2
c    -b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_1
c    -b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨  b^{28, 3}_0
c  in DIMACS:
-14771 -14772  14773 -56  14774 0
-14771 -14772  14773 -56 -14775 0
-14771 -14772  14773 -56  14776 0

c  -1+1 --> 0
c    ( b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0 ∧  p_56) -> (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧ -b^{28, 3}_0)
c  in CNF:
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_2
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_1
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_0
c  in DIMACS:
-14771  14772 -14773 -56 -14774 0
-14771  14772 -14773 -56 -14775 0
-14771  14772 -14773 -56 -14776 0

c  0+1 --> 1
c    (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧  p_56) -> (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0)
c  in CNF:
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_2
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_1
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨  b^{28, 3}_0
c  in DIMACS:
 14771  14772  14773 -56 -14774 0
 14771  14772  14773 -56 -14775 0
 14771  14772  14773 -56  14776 0

c  1+1 --> 2
c    (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0 ∧  p_56) -> (-b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0)
c  in CNF:
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_2
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨  b^{28, 3}_1
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ -p_56 ∨ -b^{28, 3}_0
c  in DIMACS:
 14771  14772 -14773 -56 -14774 0
 14771  14772 -14773 -56  14775 0
 14771  14772 -14773 -56 -14776 0

c  2+1 --> break 
c    (-b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧  p_56) -> break
c  in CNF:
c     b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 14771 -14772  14773 -56 1162 0


c  2-1 --> 1
c    (-b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧ -p_56) -> (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0)
c  in CNF:
c     b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_2
c     b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_1
c     b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨  b^{28, 3}_0
c  in DIMACS:
 14771 -14772  14773  56 -14774 0
 14771 -14772  14773  56 -14775 0
 14771 -14772  14773  56  14776 0

c  1-1 --> 0
c    (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0 ∧ -p_56) -> (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧ -b^{28, 3}_0)
c  in CNF:
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_2
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_1
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_0
c  in DIMACS:
 14771  14772 -14773  56 -14774 0
 14771  14772 -14773  56 -14775 0
 14771  14772 -14773  56 -14776 0

c  0-1 --> -1
c    (-b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧ -p_56) -> ( b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0)
c  in CNF:
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨  b^{28, 3}_2
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_1
c     b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨  b^{28, 3}_0
c  in DIMACS:
 14771  14772  14773  56  14774 0
 14771  14772  14773  56 -14775 0
 14771  14772  14773  56  14776 0

c  -1-1 --> -2
c    ( b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧  b^{28, 2}_0 ∧ -p_56) -> ( b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0)
c  in CNF:
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨  b^{28, 3}_2
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨  b^{28, 3}_1
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨  p_56 ∨ -b^{28, 3}_0
c  in DIMACS:
-14771  14772 -14773  56  14774 0
-14771  14772 -14773  56  14775 0
-14771  14772 -14773  56 -14776 0

c  -2-1 --> break 
c    ( b^{28, 2}_2 ∧  b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨  b^{28, 2}_0 ∨  p_56 ∨ break
c  in DIMACS:
-14771 -14772  14773  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 2}_2 ∧ -b^{28, 2}_1 ∧ -b^{28, 2}_0 ∧ true) 
c  in CNF:
c    -b^{28, 2}_2 ∨  b^{28, 2}_1 ∨  b^{28, 2}_0 ∨ false 
c  in DIMACS:
-14771  14772  14773  0

c  3 does not represent an automaton state.
c    -(-b^{28, 2}_2 ∧  b^{28, 2}_1 ∧  b^{28, 2}_0 ∧ true) 
c  in CNF:
c     b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ false 
c  in DIMACS:
 14771 -14772 -14773  0
c  -3 does not represent an automaton state.
c    -( b^{28, 2}_2 ∧  b^{28, 2}_1 ∧  b^{28, 2}_0 ∧ true) 
c  in CNF:
c    -b^{28, 2}_2 ∨ -b^{28, 2}_1 ∨ -b^{28, 2}_0 ∨ false 
c  in DIMACS:
-14771 -14772 -14773  0

c i = 3
c  -2+1 --> -1
c    ( b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧  p_84) -> ( b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0)
c  in CNF:
c    -b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨  b^{28, 4}_2
c    -b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_1
c    -b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨  b^{28, 4}_0
c  in DIMACS:
-14774 -14775  14776 -84  14777 0
-14774 -14775  14776 -84 -14778 0
-14774 -14775  14776 -84  14779 0

c  -1+1 --> 0
c    ( b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0 ∧  p_84) -> (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧ -b^{28, 4}_0)
c  in CNF:
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_2
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_1
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_0
c  in DIMACS:
-14774  14775 -14776 -84 -14777 0
-14774  14775 -14776 -84 -14778 0
-14774  14775 -14776 -84 -14779 0

c  0+1 --> 1
c    (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧  p_84) -> (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0)
c  in CNF:
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_2
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_1
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨  b^{28, 4}_0
c  in DIMACS:
 14774  14775  14776 -84 -14777 0
 14774  14775  14776 -84 -14778 0
 14774  14775  14776 -84  14779 0

c  1+1 --> 2
c    (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0 ∧  p_84) -> (-b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0)
c  in CNF:
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_2
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨  b^{28, 4}_1
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ -p_84 ∨ -b^{28, 4}_0
c  in DIMACS:
 14774  14775 -14776 -84 -14777 0
 14774  14775 -14776 -84  14778 0
 14774  14775 -14776 -84 -14779 0

c  2+1 --> break 
c    (-b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧  p_84) -> break
c  in CNF:
c     b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 14774 -14775  14776 -84 1162 0


c  2-1 --> 1
c    (-b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧ -p_84) -> (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0)
c  in CNF:
c     b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_2
c     b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_1
c     b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨  b^{28, 4}_0
c  in DIMACS:
 14774 -14775  14776  84 -14777 0
 14774 -14775  14776  84 -14778 0
 14774 -14775  14776  84  14779 0

c  1-1 --> 0
c    (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0 ∧ -p_84) -> (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧ -b^{28, 4}_0)
c  in CNF:
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_2
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_1
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_0
c  in DIMACS:
 14774  14775 -14776  84 -14777 0
 14774  14775 -14776  84 -14778 0
 14774  14775 -14776  84 -14779 0

c  0-1 --> -1
c    (-b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧ -p_84) -> ( b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0)
c  in CNF:
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨  b^{28, 4}_2
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_1
c     b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨  b^{28, 4}_0
c  in DIMACS:
 14774  14775  14776  84  14777 0
 14774  14775  14776  84 -14778 0
 14774  14775  14776  84  14779 0

c  -1-1 --> -2
c    ( b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧  b^{28, 3}_0 ∧ -p_84) -> ( b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0)
c  in CNF:
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨  b^{28, 4}_2
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨  b^{28, 4}_1
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨  p_84 ∨ -b^{28, 4}_0
c  in DIMACS:
-14774  14775 -14776  84  14777 0
-14774  14775 -14776  84  14778 0
-14774  14775 -14776  84 -14779 0

c  -2-1 --> break 
c    ( b^{28, 3}_2 ∧  b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨  b^{28, 3}_0 ∨  p_84 ∨ break
c  in DIMACS:
-14774 -14775  14776  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 3}_2 ∧ -b^{28, 3}_1 ∧ -b^{28, 3}_0 ∧ true) 
c  in CNF:
c    -b^{28, 3}_2 ∨  b^{28, 3}_1 ∨  b^{28, 3}_0 ∨ false 
c  in DIMACS:
-14774  14775  14776  0

c  3 does not represent an automaton state.
c    -(-b^{28, 3}_2 ∧  b^{28, 3}_1 ∧  b^{28, 3}_0 ∧ true) 
c  in CNF:
c     b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ false 
c  in DIMACS:
 14774 -14775 -14776  0
c  -3 does not represent an automaton state.
c    -( b^{28, 3}_2 ∧  b^{28, 3}_1 ∧  b^{28, 3}_0 ∧ true) 
c  in CNF:
c    -b^{28, 3}_2 ∨ -b^{28, 3}_1 ∨ -b^{28, 3}_0 ∨ false 
c  in DIMACS:
-14774 -14775 -14776  0

c i = 4
c  -2+1 --> -1
c    ( b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧  p_112) -> ( b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0)
c  in CNF:
c    -b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨  b^{28, 5}_2
c    -b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_1
c    -b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨  b^{28, 5}_0
c  in DIMACS:
-14777 -14778  14779 -112  14780 0
-14777 -14778  14779 -112 -14781 0
-14777 -14778  14779 -112  14782 0

c  -1+1 --> 0
c    ( b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0 ∧  p_112) -> (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧ -b^{28, 5}_0)
c  in CNF:
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_2
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_1
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_0
c  in DIMACS:
-14777  14778 -14779 -112 -14780 0
-14777  14778 -14779 -112 -14781 0
-14777  14778 -14779 -112 -14782 0

c  0+1 --> 1
c    (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧  p_112) -> (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0)
c  in CNF:
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_2
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_1
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨  b^{28, 5}_0
c  in DIMACS:
 14777  14778  14779 -112 -14780 0
 14777  14778  14779 -112 -14781 0
 14777  14778  14779 -112  14782 0

c  1+1 --> 2
c    (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0 ∧  p_112) -> (-b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0)
c  in CNF:
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_2
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨  b^{28, 5}_1
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ -p_112 ∨ -b^{28, 5}_0
c  in DIMACS:
 14777  14778 -14779 -112 -14780 0
 14777  14778 -14779 -112  14781 0
 14777  14778 -14779 -112 -14782 0

c  2+1 --> break 
c    (-b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧  p_112) -> break
c  in CNF:
c     b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 14777 -14778  14779 -112 1162 0


c  2-1 --> 1
c    (-b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧ -p_112) -> (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0)
c  in CNF:
c     b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_2
c     b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_1
c     b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨  b^{28, 5}_0
c  in DIMACS:
 14777 -14778  14779  112 -14780 0
 14777 -14778  14779  112 -14781 0
 14777 -14778  14779  112  14782 0

c  1-1 --> 0
c    (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0 ∧ -p_112) -> (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧ -b^{28, 5}_0)
c  in CNF:
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_2
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_1
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_0
c  in DIMACS:
 14777  14778 -14779  112 -14780 0
 14777  14778 -14779  112 -14781 0
 14777  14778 -14779  112 -14782 0

c  0-1 --> -1
c    (-b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧ -p_112) -> ( b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0)
c  in CNF:
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨  b^{28, 5}_2
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_1
c     b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨  b^{28, 5}_0
c  in DIMACS:
 14777  14778  14779  112  14780 0
 14777  14778  14779  112 -14781 0
 14777  14778  14779  112  14782 0

c  -1-1 --> -2
c    ( b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧  b^{28, 4}_0 ∧ -p_112) -> ( b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0)
c  in CNF:
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨  b^{28, 5}_2
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨  b^{28, 5}_1
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨  p_112 ∨ -b^{28, 5}_0
c  in DIMACS:
-14777  14778 -14779  112  14780 0
-14777  14778 -14779  112  14781 0
-14777  14778 -14779  112 -14782 0

c  -2-1 --> break 
c    ( b^{28, 4}_2 ∧  b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨  b^{28, 4}_0 ∨  p_112 ∨ break
c  in DIMACS:
-14777 -14778  14779  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 4}_2 ∧ -b^{28, 4}_1 ∧ -b^{28, 4}_0 ∧ true) 
c  in CNF:
c    -b^{28, 4}_2 ∨  b^{28, 4}_1 ∨  b^{28, 4}_0 ∨ false 
c  in DIMACS:
-14777  14778  14779  0

c  3 does not represent an automaton state.
c    -(-b^{28, 4}_2 ∧  b^{28, 4}_1 ∧  b^{28, 4}_0 ∧ true) 
c  in CNF:
c     b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ false 
c  in DIMACS:
 14777 -14778 -14779  0
c  -3 does not represent an automaton state.
c    -( b^{28, 4}_2 ∧  b^{28, 4}_1 ∧  b^{28, 4}_0 ∧ true) 
c  in CNF:
c    -b^{28, 4}_2 ∨ -b^{28, 4}_1 ∨ -b^{28, 4}_0 ∨ false 
c  in DIMACS:
-14777 -14778 -14779  0

c i = 5
c  -2+1 --> -1
c    ( b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧  p_140) -> ( b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0)
c  in CNF:
c    -b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨  b^{28, 6}_2
c    -b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_1
c    -b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨  b^{28, 6}_0
c  in DIMACS:
-14780 -14781  14782 -140  14783 0
-14780 -14781  14782 -140 -14784 0
-14780 -14781  14782 -140  14785 0

c  -1+1 --> 0
c    ( b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0 ∧  p_140) -> (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧ -b^{28, 6}_0)
c  in CNF:
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_2
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_1
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_0
c  in DIMACS:
-14780  14781 -14782 -140 -14783 0
-14780  14781 -14782 -140 -14784 0
-14780  14781 -14782 -140 -14785 0

c  0+1 --> 1
c    (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧  p_140) -> (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0)
c  in CNF:
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_2
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_1
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨  b^{28, 6}_0
c  in DIMACS:
 14780  14781  14782 -140 -14783 0
 14780  14781  14782 -140 -14784 0
 14780  14781  14782 -140  14785 0

c  1+1 --> 2
c    (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0 ∧  p_140) -> (-b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0)
c  in CNF:
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_2
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨  b^{28, 6}_1
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ -p_140 ∨ -b^{28, 6}_0
c  in DIMACS:
 14780  14781 -14782 -140 -14783 0
 14780  14781 -14782 -140  14784 0
 14780  14781 -14782 -140 -14785 0

c  2+1 --> break 
c    (-b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧  p_140) -> break
c  in CNF:
c     b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 14780 -14781  14782 -140 1162 0


c  2-1 --> 1
c    (-b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧ -p_140) -> (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0)
c  in CNF:
c     b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_2
c     b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_1
c     b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨  b^{28, 6}_0
c  in DIMACS:
 14780 -14781  14782  140 -14783 0
 14780 -14781  14782  140 -14784 0
 14780 -14781  14782  140  14785 0

c  1-1 --> 0
c    (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0 ∧ -p_140) -> (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧ -b^{28, 6}_0)
c  in CNF:
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_2
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_1
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_0
c  in DIMACS:
 14780  14781 -14782  140 -14783 0
 14780  14781 -14782  140 -14784 0
 14780  14781 -14782  140 -14785 0

c  0-1 --> -1
c    (-b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧ -p_140) -> ( b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0)
c  in CNF:
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨  b^{28, 6}_2
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_1
c     b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨  b^{28, 6}_0
c  in DIMACS:
 14780  14781  14782  140  14783 0
 14780  14781  14782  140 -14784 0
 14780  14781  14782  140  14785 0

c  -1-1 --> -2
c    ( b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧  b^{28, 5}_0 ∧ -p_140) -> ( b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0)
c  in CNF:
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨  b^{28, 6}_2
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨  b^{28, 6}_1
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨  p_140 ∨ -b^{28, 6}_0
c  in DIMACS:
-14780  14781 -14782  140  14783 0
-14780  14781 -14782  140  14784 0
-14780  14781 -14782  140 -14785 0

c  -2-1 --> break 
c    ( b^{28, 5}_2 ∧  b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨  b^{28, 5}_0 ∨  p_140 ∨ break
c  in DIMACS:
-14780 -14781  14782  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 5}_2 ∧ -b^{28, 5}_1 ∧ -b^{28, 5}_0 ∧ true) 
c  in CNF:
c    -b^{28, 5}_2 ∨  b^{28, 5}_1 ∨  b^{28, 5}_0 ∨ false 
c  in DIMACS:
-14780  14781  14782  0

c  3 does not represent an automaton state.
c    -(-b^{28, 5}_2 ∧  b^{28, 5}_1 ∧  b^{28, 5}_0 ∧ true) 
c  in CNF:
c     b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ false 
c  in DIMACS:
 14780 -14781 -14782  0
c  -3 does not represent an automaton state.
c    -( b^{28, 5}_2 ∧  b^{28, 5}_1 ∧  b^{28, 5}_0 ∧ true) 
c  in CNF:
c    -b^{28, 5}_2 ∨ -b^{28, 5}_1 ∨ -b^{28, 5}_0 ∨ false 
c  in DIMACS:
-14780 -14781 -14782  0

c i = 6
c  -2+1 --> -1
c    ( b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧  p_168) -> ( b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0)
c  in CNF:
c    -b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨  b^{28, 7}_2
c    -b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_1
c    -b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨  b^{28, 7}_0
c  in DIMACS:
-14783 -14784  14785 -168  14786 0
-14783 -14784  14785 -168 -14787 0
-14783 -14784  14785 -168  14788 0

c  -1+1 --> 0
c    ( b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0 ∧  p_168) -> (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧ -b^{28, 7}_0)
c  in CNF:
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_2
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_1
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_0
c  in DIMACS:
-14783  14784 -14785 -168 -14786 0
-14783  14784 -14785 -168 -14787 0
-14783  14784 -14785 -168 -14788 0

c  0+1 --> 1
c    (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧  p_168) -> (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0)
c  in CNF:
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_2
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_1
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨  b^{28, 7}_0
c  in DIMACS:
 14783  14784  14785 -168 -14786 0
 14783  14784  14785 -168 -14787 0
 14783  14784  14785 -168  14788 0

c  1+1 --> 2
c    (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0 ∧  p_168) -> (-b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0)
c  in CNF:
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_2
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨  b^{28, 7}_1
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ -p_168 ∨ -b^{28, 7}_0
c  in DIMACS:
 14783  14784 -14785 -168 -14786 0
 14783  14784 -14785 -168  14787 0
 14783  14784 -14785 -168 -14788 0

c  2+1 --> break 
c    (-b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧  p_168) -> break
c  in CNF:
c     b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 14783 -14784  14785 -168 1162 0


c  2-1 --> 1
c    (-b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧ -p_168) -> (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0)
c  in CNF:
c     b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_2
c     b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_1
c     b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨  b^{28, 7}_0
c  in DIMACS:
 14783 -14784  14785  168 -14786 0
 14783 -14784  14785  168 -14787 0
 14783 -14784  14785  168  14788 0

c  1-1 --> 0
c    (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0 ∧ -p_168) -> (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧ -b^{28, 7}_0)
c  in CNF:
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_2
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_1
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_0
c  in DIMACS:
 14783  14784 -14785  168 -14786 0
 14783  14784 -14785  168 -14787 0
 14783  14784 -14785  168 -14788 0

c  0-1 --> -1
c    (-b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧ -p_168) -> ( b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0)
c  in CNF:
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨  b^{28, 7}_2
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_1
c     b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨  b^{28, 7}_0
c  in DIMACS:
 14783  14784  14785  168  14786 0
 14783  14784  14785  168 -14787 0
 14783  14784  14785  168  14788 0

c  -1-1 --> -2
c    ( b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧  b^{28, 6}_0 ∧ -p_168) -> ( b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0)
c  in CNF:
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨  b^{28, 7}_2
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨  b^{28, 7}_1
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨  p_168 ∨ -b^{28, 7}_0
c  in DIMACS:
-14783  14784 -14785  168  14786 0
-14783  14784 -14785  168  14787 0
-14783  14784 -14785  168 -14788 0

c  -2-1 --> break 
c    ( b^{28, 6}_2 ∧  b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨  b^{28, 6}_0 ∨  p_168 ∨ break
c  in DIMACS:
-14783 -14784  14785  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 6}_2 ∧ -b^{28, 6}_1 ∧ -b^{28, 6}_0 ∧ true) 
c  in CNF:
c    -b^{28, 6}_2 ∨  b^{28, 6}_1 ∨  b^{28, 6}_0 ∨ false 
c  in DIMACS:
-14783  14784  14785  0

c  3 does not represent an automaton state.
c    -(-b^{28, 6}_2 ∧  b^{28, 6}_1 ∧  b^{28, 6}_0 ∧ true) 
c  in CNF:
c     b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ false 
c  in DIMACS:
 14783 -14784 -14785  0
c  -3 does not represent an automaton state.
c    -( b^{28, 6}_2 ∧  b^{28, 6}_1 ∧  b^{28, 6}_0 ∧ true) 
c  in CNF:
c    -b^{28, 6}_2 ∨ -b^{28, 6}_1 ∨ -b^{28, 6}_0 ∨ false 
c  in DIMACS:
-14783 -14784 -14785  0

c i = 7
c  -2+1 --> -1
c    ( b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧  p_196) -> ( b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0)
c  in CNF:
c    -b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨  b^{28, 8}_2
c    -b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_1
c    -b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨  b^{28, 8}_0
c  in DIMACS:
-14786 -14787  14788 -196  14789 0
-14786 -14787  14788 -196 -14790 0
-14786 -14787  14788 -196  14791 0

c  -1+1 --> 0
c    ( b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0 ∧  p_196) -> (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧ -b^{28, 8}_0)
c  in CNF:
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_2
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_1
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_0
c  in DIMACS:
-14786  14787 -14788 -196 -14789 0
-14786  14787 -14788 -196 -14790 0
-14786  14787 -14788 -196 -14791 0

c  0+1 --> 1
c    (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧  p_196) -> (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0)
c  in CNF:
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_2
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_1
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨  b^{28, 8}_0
c  in DIMACS:
 14786  14787  14788 -196 -14789 0
 14786  14787  14788 -196 -14790 0
 14786  14787  14788 -196  14791 0

c  1+1 --> 2
c    (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0 ∧  p_196) -> (-b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0)
c  in CNF:
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_2
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨  b^{28, 8}_1
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ -p_196 ∨ -b^{28, 8}_0
c  in DIMACS:
 14786  14787 -14788 -196 -14789 0
 14786  14787 -14788 -196  14790 0
 14786  14787 -14788 -196 -14791 0

c  2+1 --> break 
c    (-b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧  p_196) -> break
c  in CNF:
c     b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 14786 -14787  14788 -196 1162 0


c  2-1 --> 1
c    (-b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧ -p_196) -> (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0)
c  in CNF:
c     b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_2
c     b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_1
c     b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨  b^{28, 8}_0
c  in DIMACS:
 14786 -14787  14788  196 -14789 0
 14786 -14787  14788  196 -14790 0
 14786 -14787  14788  196  14791 0

c  1-1 --> 0
c    (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0 ∧ -p_196) -> (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧ -b^{28, 8}_0)
c  in CNF:
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_2
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_1
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_0
c  in DIMACS:
 14786  14787 -14788  196 -14789 0
 14786  14787 -14788  196 -14790 0
 14786  14787 -14788  196 -14791 0

c  0-1 --> -1
c    (-b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧ -p_196) -> ( b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0)
c  in CNF:
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨  b^{28, 8}_2
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_1
c     b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨  b^{28, 8}_0
c  in DIMACS:
 14786  14787  14788  196  14789 0
 14786  14787  14788  196 -14790 0
 14786  14787  14788  196  14791 0

c  -1-1 --> -2
c    ( b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧  b^{28, 7}_0 ∧ -p_196) -> ( b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0)
c  in CNF:
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨  b^{28, 8}_2
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨  b^{28, 8}_1
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨  p_196 ∨ -b^{28, 8}_0
c  in DIMACS:
-14786  14787 -14788  196  14789 0
-14786  14787 -14788  196  14790 0
-14786  14787 -14788  196 -14791 0

c  -2-1 --> break 
c    ( b^{28, 7}_2 ∧  b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨  b^{28, 7}_0 ∨  p_196 ∨ break
c  in DIMACS:
-14786 -14787  14788  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 7}_2 ∧ -b^{28, 7}_1 ∧ -b^{28, 7}_0 ∧ true) 
c  in CNF:
c    -b^{28, 7}_2 ∨  b^{28, 7}_1 ∨  b^{28, 7}_0 ∨ false 
c  in DIMACS:
-14786  14787  14788  0

c  3 does not represent an automaton state.
c    -(-b^{28, 7}_2 ∧  b^{28, 7}_1 ∧  b^{28, 7}_0 ∧ true) 
c  in CNF:
c     b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ false 
c  in DIMACS:
 14786 -14787 -14788  0
c  -3 does not represent an automaton state.
c    -( b^{28, 7}_2 ∧  b^{28, 7}_1 ∧  b^{28, 7}_0 ∧ true) 
c  in CNF:
c    -b^{28, 7}_2 ∨ -b^{28, 7}_1 ∨ -b^{28, 7}_0 ∨ false 
c  in DIMACS:
-14786 -14787 -14788  0

c i = 8
c  -2+1 --> -1
c    ( b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧  p_224) -> ( b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0)
c  in CNF:
c    -b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨  b^{28, 9}_2
c    -b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_1
c    -b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨  b^{28, 9}_0
c  in DIMACS:
-14789 -14790  14791 -224  14792 0
-14789 -14790  14791 -224 -14793 0
-14789 -14790  14791 -224  14794 0

c  -1+1 --> 0
c    ( b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0 ∧  p_224) -> (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧ -b^{28, 9}_0)
c  in CNF:
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_2
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_1
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_0
c  in DIMACS:
-14789  14790 -14791 -224 -14792 0
-14789  14790 -14791 -224 -14793 0
-14789  14790 -14791 -224 -14794 0

c  0+1 --> 1
c    (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧  p_224) -> (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0)
c  in CNF:
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_2
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_1
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨  b^{28, 9}_0
c  in DIMACS:
 14789  14790  14791 -224 -14792 0
 14789  14790  14791 -224 -14793 0
 14789  14790  14791 -224  14794 0

c  1+1 --> 2
c    (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0 ∧  p_224) -> (-b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0)
c  in CNF:
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_2
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨  b^{28, 9}_1
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ -p_224 ∨ -b^{28, 9}_0
c  in DIMACS:
 14789  14790 -14791 -224 -14792 0
 14789  14790 -14791 -224  14793 0
 14789  14790 -14791 -224 -14794 0

c  2+1 --> break 
c    (-b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧  p_224) -> break
c  in CNF:
c     b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 14789 -14790  14791 -224 1162 0


c  2-1 --> 1
c    (-b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧ -p_224) -> (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0)
c  in CNF:
c     b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_2
c     b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_1
c     b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨  b^{28, 9}_0
c  in DIMACS:
 14789 -14790  14791  224 -14792 0
 14789 -14790  14791  224 -14793 0
 14789 -14790  14791  224  14794 0

c  1-1 --> 0
c    (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0 ∧ -p_224) -> (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧ -b^{28, 9}_0)
c  in CNF:
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_2
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_1
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_0
c  in DIMACS:
 14789  14790 -14791  224 -14792 0
 14789  14790 -14791  224 -14793 0
 14789  14790 -14791  224 -14794 0

c  0-1 --> -1
c    (-b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧ -p_224) -> ( b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0)
c  in CNF:
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨  b^{28, 9}_2
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_1
c     b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨  b^{28, 9}_0
c  in DIMACS:
 14789  14790  14791  224  14792 0
 14789  14790  14791  224 -14793 0
 14789  14790  14791  224  14794 0

c  -1-1 --> -2
c    ( b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧  b^{28, 8}_0 ∧ -p_224) -> ( b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0)
c  in CNF:
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨  b^{28, 9}_2
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨  b^{28, 9}_1
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨  p_224 ∨ -b^{28, 9}_0
c  in DIMACS:
-14789  14790 -14791  224  14792 0
-14789  14790 -14791  224  14793 0
-14789  14790 -14791  224 -14794 0

c  -2-1 --> break 
c    ( b^{28, 8}_2 ∧  b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨  b^{28, 8}_0 ∨  p_224 ∨ break
c  in DIMACS:
-14789 -14790  14791  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 8}_2 ∧ -b^{28, 8}_1 ∧ -b^{28, 8}_0 ∧ true) 
c  in CNF:
c    -b^{28, 8}_2 ∨  b^{28, 8}_1 ∨  b^{28, 8}_0 ∨ false 
c  in DIMACS:
-14789  14790  14791  0

c  3 does not represent an automaton state.
c    -(-b^{28, 8}_2 ∧  b^{28, 8}_1 ∧  b^{28, 8}_0 ∧ true) 
c  in CNF:
c     b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ false 
c  in DIMACS:
 14789 -14790 -14791  0
c  -3 does not represent an automaton state.
c    -( b^{28, 8}_2 ∧  b^{28, 8}_1 ∧  b^{28, 8}_0 ∧ true) 
c  in CNF:
c    -b^{28, 8}_2 ∨ -b^{28, 8}_1 ∨ -b^{28, 8}_0 ∨ false 
c  in DIMACS:
-14789 -14790 -14791  0

c i = 9
c  -2+1 --> -1
c    ( b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧  p_252) -> ( b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0)
c  in CNF:
c    -b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨  b^{28, 10}_2
c    -b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_1
c    -b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨  b^{28, 10}_0
c  in DIMACS:
-14792 -14793  14794 -252  14795 0
-14792 -14793  14794 -252 -14796 0
-14792 -14793  14794 -252  14797 0

c  -1+1 --> 0
c    ( b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0 ∧  p_252) -> (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧ -b^{28, 10}_0)
c  in CNF:
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_2
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_1
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_0
c  in DIMACS:
-14792  14793 -14794 -252 -14795 0
-14792  14793 -14794 -252 -14796 0
-14792  14793 -14794 -252 -14797 0

c  0+1 --> 1
c    (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧  p_252) -> (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0)
c  in CNF:
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_2
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_1
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨  b^{28, 10}_0
c  in DIMACS:
 14792  14793  14794 -252 -14795 0
 14792  14793  14794 -252 -14796 0
 14792  14793  14794 -252  14797 0

c  1+1 --> 2
c    (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0 ∧  p_252) -> (-b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0)
c  in CNF:
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_2
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨  b^{28, 10}_1
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ -p_252 ∨ -b^{28, 10}_0
c  in DIMACS:
 14792  14793 -14794 -252 -14795 0
 14792  14793 -14794 -252  14796 0
 14792  14793 -14794 -252 -14797 0

c  2+1 --> break 
c    (-b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧  p_252) -> break
c  in CNF:
c     b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 14792 -14793  14794 -252 1162 0


c  2-1 --> 1
c    (-b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧ -p_252) -> (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0)
c  in CNF:
c     b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_2
c     b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_1
c     b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨  b^{28, 10}_0
c  in DIMACS:
 14792 -14793  14794  252 -14795 0
 14792 -14793  14794  252 -14796 0
 14792 -14793  14794  252  14797 0

c  1-1 --> 0
c    (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0 ∧ -p_252) -> (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧ -b^{28, 10}_0)
c  in CNF:
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_2
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_1
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_0
c  in DIMACS:
 14792  14793 -14794  252 -14795 0
 14792  14793 -14794  252 -14796 0
 14792  14793 -14794  252 -14797 0

c  0-1 --> -1
c    (-b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧ -p_252) -> ( b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0)
c  in CNF:
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨  b^{28, 10}_2
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_1
c     b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨  b^{28, 10}_0
c  in DIMACS:
 14792  14793  14794  252  14795 0
 14792  14793  14794  252 -14796 0
 14792  14793  14794  252  14797 0

c  -1-1 --> -2
c    ( b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧  b^{28, 9}_0 ∧ -p_252) -> ( b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0)
c  in CNF:
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨  b^{28, 10}_2
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨  b^{28, 10}_1
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨  p_252 ∨ -b^{28, 10}_0
c  in DIMACS:
-14792  14793 -14794  252  14795 0
-14792  14793 -14794  252  14796 0
-14792  14793 -14794  252 -14797 0

c  -2-1 --> break 
c    ( b^{28, 9}_2 ∧  b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨  b^{28, 9}_0 ∨  p_252 ∨ break
c  in DIMACS:
-14792 -14793  14794  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 9}_2 ∧ -b^{28, 9}_1 ∧ -b^{28, 9}_0 ∧ true) 
c  in CNF:
c    -b^{28, 9}_2 ∨  b^{28, 9}_1 ∨  b^{28, 9}_0 ∨ false 
c  in DIMACS:
-14792  14793  14794  0

c  3 does not represent an automaton state.
c    -(-b^{28, 9}_2 ∧  b^{28, 9}_1 ∧  b^{28, 9}_0 ∧ true) 
c  in CNF:
c     b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ false 
c  in DIMACS:
 14792 -14793 -14794  0
c  -3 does not represent an automaton state.
c    -( b^{28, 9}_2 ∧  b^{28, 9}_1 ∧  b^{28, 9}_0 ∧ true) 
c  in CNF:
c    -b^{28, 9}_2 ∨ -b^{28, 9}_1 ∨ -b^{28, 9}_0 ∨ false 
c  in DIMACS:
-14792 -14793 -14794  0

c i = 10
c  -2+1 --> -1
c    ( b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧  p_280) -> ( b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0)
c  in CNF:
c    -b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨  b^{28, 11}_2
c    -b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_1
c    -b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨  b^{28, 11}_0
c  in DIMACS:
-14795 -14796  14797 -280  14798 0
-14795 -14796  14797 -280 -14799 0
-14795 -14796  14797 -280  14800 0

c  -1+1 --> 0
c    ( b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0 ∧  p_280) -> (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧ -b^{28, 11}_0)
c  in CNF:
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_2
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_1
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_0
c  in DIMACS:
-14795  14796 -14797 -280 -14798 0
-14795  14796 -14797 -280 -14799 0
-14795  14796 -14797 -280 -14800 0

c  0+1 --> 1
c    (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧  p_280) -> (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0)
c  in CNF:
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_2
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_1
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨  b^{28, 11}_0
c  in DIMACS:
 14795  14796  14797 -280 -14798 0
 14795  14796  14797 -280 -14799 0
 14795  14796  14797 -280  14800 0

c  1+1 --> 2
c    (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0 ∧  p_280) -> (-b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0)
c  in CNF:
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_2
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨  b^{28, 11}_1
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ -p_280 ∨ -b^{28, 11}_0
c  in DIMACS:
 14795  14796 -14797 -280 -14798 0
 14795  14796 -14797 -280  14799 0
 14795  14796 -14797 -280 -14800 0

c  2+1 --> break 
c    (-b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧  p_280) -> break
c  in CNF:
c     b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 14795 -14796  14797 -280 1162 0


c  2-1 --> 1
c    (-b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧ -p_280) -> (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0)
c  in CNF:
c     b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_2
c     b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_1
c     b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨  b^{28, 11}_0
c  in DIMACS:
 14795 -14796  14797  280 -14798 0
 14795 -14796  14797  280 -14799 0
 14795 -14796  14797  280  14800 0

c  1-1 --> 0
c    (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0 ∧ -p_280) -> (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧ -b^{28, 11}_0)
c  in CNF:
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_2
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_1
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_0
c  in DIMACS:
 14795  14796 -14797  280 -14798 0
 14795  14796 -14797  280 -14799 0
 14795  14796 -14797  280 -14800 0

c  0-1 --> -1
c    (-b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧ -p_280) -> ( b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0)
c  in CNF:
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨  b^{28, 11}_2
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_1
c     b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨  b^{28, 11}_0
c  in DIMACS:
 14795  14796  14797  280  14798 0
 14795  14796  14797  280 -14799 0
 14795  14796  14797  280  14800 0

c  -1-1 --> -2
c    ( b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧  b^{28, 10}_0 ∧ -p_280) -> ( b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0)
c  in CNF:
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨  b^{28, 11}_2
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨  b^{28, 11}_1
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨  p_280 ∨ -b^{28, 11}_0
c  in DIMACS:
-14795  14796 -14797  280  14798 0
-14795  14796 -14797  280  14799 0
-14795  14796 -14797  280 -14800 0

c  -2-1 --> break 
c    ( b^{28, 10}_2 ∧  b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨  b^{28, 10}_0 ∨  p_280 ∨ break
c  in DIMACS:
-14795 -14796  14797  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 10}_2 ∧ -b^{28, 10}_1 ∧ -b^{28, 10}_0 ∧ true) 
c  in CNF:
c    -b^{28, 10}_2 ∨  b^{28, 10}_1 ∨  b^{28, 10}_0 ∨ false 
c  in DIMACS:
-14795  14796  14797  0

c  3 does not represent an automaton state.
c    -(-b^{28, 10}_2 ∧  b^{28, 10}_1 ∧  b^{28, 10}_0 ∧ true) 
c  in CNF:
c     b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ false 
c  in DIMACS:
 14795 -14796 -14797  0
c  -3 does not represent an automaton state.
c    -( b^{28, 10}_2 ∧  b^{28, 10}_1 ∧  b^{28, 10}_0 ∧ true) 
c  in CNF:
c    -b^{28, 10}_2 ∨ -b^{28, 10}_1 ∨ -b^{28, 10}_0 ∨ false 
c  in DIMACS:
-14795 -14796 -14797  0

c i = 11
c  -2+1 --> -1
c    ( b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧  p_308) -> ( b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0)
c  in CNF:
c    -b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨  b^{28, 12}_2
c    -b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_1
c    -b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨  b^{28, 12}_0
c  in DIMACS:
-14798 -14799  14800 -308  14801 0
-14798 -14799  14800 -308 -14802 0
-14798 -14799  14800 -308  14803 0

c  -1+1 --> 0
c    ( b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0 ∧  p_308) -> (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧ -b^{28, 12}_0)
c  in CNF:
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_2
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_1
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_0
c  in DIMACS:
-14798  14799 -14800 -308 -14801 0
-14798  14799 -14800 -308 -14802 0
-14798  14799 -14800 -308 -14803 0

c  0+1 --> 1
c    (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧  p_308) -> (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0)
c  in CNF:
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_2
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_1
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨  b^{28, 12}_0
c  in DIMACS:
 14798  14799  14800 -308 -14801 0
 14798  14799  14800 -308 -14802 0
 14798  14799  14800 -308  14803 0

c  1+1 --> 2
c    (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0 ∧  p_308) -> (-b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0)
c  in CNF:
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_2
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨  b^{28, 12}_1
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ -p_308 ∨ -b^{28, 12}_0
c  in DIMACS:
 14798  14799 -14800 -308 -14801 0
 14798  14799 -14800 -308  14802 0
 14798  14799 -14800 -308 -14803 0

c  2+1 --> break 
c    (-b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧  p_308) -> break
c  in CNF:
c     b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 14798 -14799  14800 -308 1162 0


c  2-1 --> 1
c    (-b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧ -p_308) -> (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0)
c  in CNF:
c     b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_2
c     b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_1
c     b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨  b^{28, 12}_0
c  in DIMACS:
 14798 -14799  14800  308 -14801 0
 14798 -14799  14800  308 -14802 0
 14798 -14799  14800  308  14803 0

c  1-1 --> 0
c    (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0 ∧ -p_308) -> (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧ -b^{28, 12}_0)
c  in CNF:
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_2
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_1
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_0
c  in DIMACS:
 14798  14799 -14800  308 -14801 0
 14798  14799 -14800  308 -14802 0
 14798  14799 -14800  308 -14803 0

c  0-1 --> -1
c    (-b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧ -p_308) -> ( b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0)
c  in CNF:
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨  b^{28, 12}_2
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_1
c     b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨  b^{28, 12}_0
c  in DIMACS:
 14798  14799  14800  308  14801 0
 14798  14799  14800  308 -14802 0
 14798  14799  14800  308  14803 0

c  -1-1 --> -2
c    ( b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧  b^{28, 11}_0 ∧ -p_308) -> ( b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0)
c  in CNF:
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨  b^{28, 12}_2
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨  b^{28, 12}_1
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨  p_308 ∨ -b^{28, 12}_0
c  in DIMACS:
-14798  14799 -14800  308  14801 0
-14798  14799 -14800  308  14802 0
-14798  14799 -14800  308 -14803 0

c  -2-1 --> break 
c    ( b^{28, 11}_2 ∧  b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨  b^{28, 11}_0 ∨  p_308 ∨ break
c  in DIMACS:
-14798 -14799  14800  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 11}_2 ∧ -b^{28, 11}_1 ∧ -b^{28, 11}_0 ∧ true) 
c  in CNF:
c    -b^{28, 11}_2 ∨  b^{28, 11}_1 ∨  b^{28, 11}_0 ∨ false 
c  in DIMACS:
-14798  14799  14800  0

c  3 does not represent an automaton state.
c    -(-b^{28, 11}_2 ∧  b^{28, 11}_1 ∧  b^{28, 11}_0 ∧ true) 
c  in CNF:
c     b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ false 
c  in DIMACS:
 14798 -14799 -14800  0
c  -3 does not represent an automaton state.
c    -( b^{28, 11}_2 ∧  b^{28, 11}_1 ∧  b^{28, 11}_0 ∧ true) 
c  in CNF:
c    -b^{28, 11}_2 ∨ -b^{28, 11}_1 ∨ -b^{28, 11}_0 ∨ false 
c  in DIMACS:
-14798 -14799 -14800  0

c i = 12
c  -2+1 --> -1
c    ( b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧  p_336) -> ( b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0)
c  in CNF:
c    -b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨  b^{28, 13}_2
c    -b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_1
c    -b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨  b^{28, 13}_0
c  in DIMACS:
-14801 -14802  14803 -336  14804 0
-14801 -14802  14803 -336 -14805 0
-14801 -14802  14803 -336  14806 0

c  -1+1 --> 0
c    ( b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0 ∧  p_336) -> (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧ -b^{28, 13}_0)
c  in CNF:
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_2
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_1
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_0
c  in DIMACS:
-14801  14802 -14803 -336 -14804 0
-14801  14802 -14803 -336 -14805 0
-14801  14802 -14803 -336 -14806 0

c  0+1 --> 1
c    (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧  p_336) -> (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0)
c  in CNF:
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_2
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_1
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨  b^{28, 13}_0
c  in DIMACS:
 14801  14802  14803 -336 -14804 0
 14801  14802  14803 -336 -14805 0
 14801  14802  14803 -336  14806 0

c  1+1 --> 2
c    (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0 ∧  p_336) -> (-b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0)
c  in CNF:
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_2
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨  b^{28, 13}_1
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ -p_336 ∨ -b^{28, 13}_0
c  in DIMACS:
 14801  14802 -14803 -336 -14804 0
 14801  14802 -14803 -336  14805 0
 14801  14802 -14803 -336 -14806 0

c  2+1 --> break 
c    (-b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧  p_336) -> break
c  in CNF:
c     b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 14801 -14802  14803 -336 1162 0


c  2-1 --> 1
c    (-b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧ -p_336) -> (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0)
c  in CNF:
c     b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_2
c     b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_1
c     b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨  b^{28, 13}_0
c  in DIMACS:
 14801 -14802  14803  336 -14804 0
 14801 -14802  14803  336 -14805 0
 14801 -14802  14803  336  14806 0

c  1-1 --> 0
c    (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0 ∧ -p_336) -> (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧ -b^{28, 13}_0)
c  in CNF:
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_2
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_1
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_0
c  in DIMACS:
 14801  14802 -14803  336 -14804 0
 14801  14802 -14803  336 -14805 0
 14801  14802 -14803  336 -14806 0

c  0-1 --> -1
c    (-b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧ -p_336) -> ( b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0)
c  in CNF:
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨  b^{28, 13}_2
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_1
c     b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨  b^{28, 13}_0
c  in DIMACS:
 14801  14802  14803  336  14804 0
 14801  14802  14803  336 -14805 0
 14801  14802  14803  336  14806 0

c  -1-1 --> -2
c    ( b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧  b^{28, 12}_0 ∧ -p_336) -> ( b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0)
c  in CNF:
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨  b^{28, 13}_2
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨  b^{28, 13}_1
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨  p_336 ∨ -b^{28, 13}_0
c  in DIMACS:
-14801  14802 -14803  336  14804 0
-14801  14802 -14803  336  14805 0
-14801  14802 -14803  336 -14806 0

c  -2-1 --> break 
c    ( b^{28, 12}_2 ∧  b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨  b^{28, 12}_0 ∨  p_336 ∨ break
c  in DIMACS:
-14801 -14802  14803  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 12}_2 ∧ -b^{28, 12}_1 ∧ -b^{28, 12}_0 ∧ true) 
c  in CNF:
c    -b^{28, 12}_2 ∨  b^{28, 12}_1 ∨  b^{28, 12}_0 ∨ false 
c  in DIMACS:
-14801  14802  14803  0

c  3 does not represent an automaton state.
c    -(-b^{28, 12}_2 ∧  b^{28, 12}_1 ∧  b^{28, 12}_0 ∧ true) 
c  in CNF:
c     b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ false 
c  in DIMACS:
 14801 -14802 -14803  0
c  -3 does not represent an automaton state.
c    -( b^{28, 12}_2 ∧  b^{28, 12}_1 ∧  b^{28, 12}_0 ∧ true) 
c  in CNF:
c    -b^{28, 12}_2 ∨ -b^{28, 12}_1 ∨ -b^{28, 12}_0 ∨ false 
c  in DIMACS:
-14801 -14802 -14803  0

c i = 13
c  -2+1 --> -1
c    ( b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧  p_364) -> ( b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0)
c  in CNF:
c    -b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨  b^{28, 14}_2
c    -b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_1
c    -b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨  b^{28, 14}_0
c  in DIMACS:
-14804 -14805  14806 -364  14807 0
-14804 -14805  14806 -364 -14808 0
-14804 -14805  14806 -364  14809 0

c  -1+1 --> 0
c    ( b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0 ∧  p_364) -> (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧ -b^{28, 14}_0)
c  in CNF:
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_2
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_1
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_0
c  in DIMACS:
-14804  14805 -14806 -364 -14807 0
-14804  14805 -14806 -364 -14808 0
-14804  14805 -14806 -364 -14809 0

c  0+1 --> 1
c    (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧  p_364) -> (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0)
c  in CNF:
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_2
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_1
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨  b^{28, 14}_0
c  in DIMACS:
 14804  14805  14806 -364 -14807 0
 14804  14805  14806 -364 -14808 0
 14804  14805  14806 -364  14809 0

c  1+1 --> 2
c    (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0 ∧  p_364) -> (-b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0)
c  in CNF:
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_2
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨  b^{28, 14}_1
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ -p_364 ∨ -b^{28, 14}_0
c  in DIMACS:
 14804  14805 -14806 -364 -14807 0
 14804  14805 -14806 -364  14808 0
 14804  14805 -14806 -364 -14809 0

c  2+1 --> break 
c    (-b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧  p_364) -> break
c  in CNF:
c     b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 14804 -14805  14806 -364 1162 0


c  2-1 --> 1
c    (-b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧ -p_364) -> (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0)
c  in CNF:
c     b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_2
c     b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_1
c     b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨  b^{28, 14}_0
c  in DIMACS:
 14804 -14805  14806  364 -14807 0
 14804 -14805  14806  364 -14808 0
 14804 -14805  14806  364  14809 0

c  1-1 --> 0
c    (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0 ∧ -p_364) -> (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧ -b^{28, 14}_0)
c  in CNF:
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_2
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_1
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_0
c  in DIMACS:
 14804  14805 -14806  364 -14807 0
 14804  14805 -14806  364 -14808 0
 14804  14805 -14806  364 -14809 0

c  0-1 --> -1
c    (-b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧ -p_364) -> ( b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0)
c  in CNF:
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨  b^{28, 14}_2
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_1
c     b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨  b^{28, 14}_0
c  in DIMACS:
 14804  14805  14806  364  14807 0
 14804  14805  14806  364 -14808 0
 14804  14805  14806  364  14809 0

c  -1-1 --> -2
c    ( b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧  b^{28, 13}_0 ∧ -p_364) -> ( b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0)
c  in CNF:
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨  b^{28, 14}_2
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨  b^{28, 14}_1
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨  p_364 ∨ -b^{28, 14}_0
c  in DIMACS:
-14804  14805 -14806  364  14807 0
-14804  14805 -14806  364  14808 0
-14804  14805 -14806  364 -14809 0

c  -2-1 --> break 
c    ( b^{28, 13}_2 ∧  b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨  b^{28, 13}_0 ∨  p_364 ∨ break
c  in DIMACS:
-14804 -14805  14806  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 13}_2 ∧ -b^{28, 13}_1 ∧ -b^{28, 13}_0 ∧ true) 
c  in CNF:
c    -b^{28, 13}_2 ∨  b^{28, 13}_1 ∨  b^{28, 13}_0 ∨ false 
c  in DIMACS:
-14804  14805  14806  0

c  3 does not represent an automaton state.
c    -(-b^{28, 13}_2 ∧  b^{28, 13}_1 ∧  b^{28, 13}_0 ∧ true) 
c  in CNF:
c     b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ false 
c  in DIMACS:
 14804 -14805 -14806  0
c  -3 does not represent an automaton state.
c    -( b^{28, 13}_2 ∧  b^{28, 13}_1 ∧  b^{28, 13}_0 ∧ true) 
c  in CNF:
c    -b^{28, 13}_2 ∨ -b^{28, 13}_1 ∨ -b^{28, 13}_0 ∨ false 
c  in DIMACS:
-14804 -14805 -14806  0

c i = 14
c  -2+1 --> -1
c    ( b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧  p_392) -> ( b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0)
c  in CNF:
c    -b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨  b^{28, 15}_2
c    -b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_1
c    -b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨  b^{28, 15}_0
c  in DIMACS:
-14807 -14808  14809 -392  14810 0
-14807 -14808  14809 -392 -14811 0
-14807 -14808  14809 -392  14812 0

c  -1+1 --> 0
c    ( b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0 ∧  p_392) -> (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧ -b^{28, 15}_0)
c  in CNF:
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_2
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_1
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_0
c  in DIMACS:
-14807  14808 -14809 -392 -14810 0
-14807  14808 -14809 -392 -14811 0
-14807  14808 -14809 -392 -14812 0

c  0+1 --> 1
c    (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧  p_392) -> (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0)
c  in CNF:
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_2
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_1
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨  b^{28, 15}_0
c  in DIMACS:
 14807  14808  14809 -392 -14810 0
 14807  14808  14809 -392 -14811 0
 14807  14808  14809 -392  14812 0

c  1+1 --> 2
c    (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0 ∧  p_392) -> (-b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0)
c  in CNF:
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_2
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨  b^{28, 15}_1
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ -p_392 ∨ -b^{28, 15}_0
c  in DIMACS:
 14807  14808 -14809 -392 -14810 0
 14807  14808 -14809 -392  14811 0
 14807  14808 -14809 -392 -14812 0

c  2+1 --> break 
c    (-b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧  p_392) -> break
c  in CNF:
c     b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 14807 -14808  14809 -392 1162 0


c  2-1 --> 1
c    (-b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧ -p_392) -> (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0)
c  in CNF:
c     b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_2
c     b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_1
c     b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨  b^{28, 15}_0
c  in DIMACS:
 14807 -14808  14809  392 -14810 0
 14807 -14808  14809  392 -14811 0
 14807 -14808  14809  392  14812 0

c  1-1 --> 0
c    (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0 ∧ -p_392) -> (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧ -b^{28, 15}_0)
c  in CNF:
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_2
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_1
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_0
c  in DIMACS:
 14807  14808 -14809  392 -14810 0
 14807  14808 -14809  392 -14811 0
 14807  14808 -14809  392 -14812 0

c  0-1 --> -1
c    (-b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧ -p_392) -> ( b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0)
c  in CNF:
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨  b^{28, 15}_2
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_1
c     b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨  b^{28, 15}_0
c  in DIMACS:
 14807  14808  14809  392  14810 0
 14807  14808  14809  392 -14811 0
 14807  14808  14809  392  14812 0

c  -1-1 --> -2
c    ( b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧  b^{28, 14}_0 ∧ -p_392) -> ( b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0)
c  in CNF:
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨  b^{28, 15}_2
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨  b^{28, 15}_1
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨  p_392 ∨ -b^{28, 15}_0
c  in DIMACS:
-14807  14808 -14809  392  14810 0
-14807  14808 -14809  392  14811 0
-14807  14808 -14809  392 -14812 0

c  -2-1 --> break 
c    ( b^{28, 14}_2 ∧  b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨  b^{28, 14}_0 ∨  p_392 ∨ break
c  in DIMACS:
-14807 -14808  14809  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 14}_2 ∧ -b^{28, 14}_1 ∧ -b^{28, 14}_0 ∧ true) 
c  in CNF:
c    -b^{28, 14}_2 ∨  b^{28, 14}_1 ∨  b^{28, 14}_0 ∨ false 
c  in DIMACS:
-14807  14808  14809  0

c  3 does not represent an automaton state.
c    -(-b^{28, 14}_2 ∧  b^{28, 14}_1 ∧  b^{28, 14}_0 ∧ true) 
c  in CNF:
c     b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ false 
c  in DIMACS:
 14807 -14808 -14809  0
c  -3 does not represent an automaton state.
c    -( b^{28, 14}_2 ∧  b^{28, 14}_1 ∧  b^{28, 14}_0 ∧ true) 
c  in CNF:
c    -b^{28, 14}_2 ∨ -b^{28, 14}_1 ∨ -b^{28, 14}_0 ∨ false 
c  in DIMACS:
-14807 -14808 -14809  0

c i = 15
c  -2+1 --> -1
c    ( b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧  p_420) -> ( b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0)
c  in CNF:
c    -b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨  b^{28, 16}_2
c    -b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_1
c    -b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨  b^{28, 16}_0
c  in DIMACS:
-14810 -14811  14812 -420  14813 0
-14810 -14811  14812 -420 -14814 0
-14810 -14811  14812 -420  14815 0

c  -1+1 --> 0
c    ( b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0 ∧  p_420) -> (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧ -b^{28, 16}_0)
c  in CNF:
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_2
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_1
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_0
c  in DIMACS:
-14810  14811 -14812 -420 -14813 0
-14810  14811 -14812 -420 -14814 0
-14810  14811 -14812 -420 -14815 0

c  0+1 --> 1
c    (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧  p_420) -> (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0)
c  in CNF:
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_2
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_1
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨  b^{28, 16}_0
c  in DIMACS:
 14810  14811  14812 -420 -14813 0
 14810  14811  14812 -420 -14814 0
 14810  14811  14812 -420  14815 0

c  1+1 --> 2
c    (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0 ∧  p_420) -> (-b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0)
c  in CNF:
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_2
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨  b^{28, 16}_1
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ -p_420 ∨ -b^{28, 16}_0
c  in DIMACS:
 14810  14811 -14812 -420 -14813 0
 14810  14811 -14812 -420  14814 0
 14810  14811 -14812 -420 -14815 0

c  2+1 --> break 
c    (-b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧  p_420) -> break
c  in CNF:
c     b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 14810 -14811  14812 -420 1162 0


c  2-1 --> 1
c    (-b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧ -p_420) -> (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0)
c  in CNF:
c     b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_2
c     b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_1
c     b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨  b^{28, 16}_0
c  in DIMACS:
 14810 -14811  14812  420 -14813 0
 14810 -14811  14812  420 -14814 0
 14810 -14811  14812  420  14815 0

c  1-1 --> 0
c    (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0 ∧ -p_420) -> (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧ -b^{28, 16}_0)
c  in CNF:
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_2
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_1
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_0
c  in DIMACS:
 14810  14811 -14812  420 -14813 0
 14810  14811 -14812  420 -14814 0
 14810  14811 -14812  420 -14815 0

c  0-1 --> -1
c    (-b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧ -p_420) -> ( b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0)
c  in CNF:
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨  b^{28, 16}_2
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_1
c     b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨  b^{28, 16}_0
c  in DIMACS:
 14810  14811  14812  420  14813 0
 14810  14811  14812  420 -14814 0
 14810  14811  14812  420  14815 0

c  -1-1 --> -2
c    ( b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧  b^{28, 15}_0 ∧ -p_420) -> ( b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0)
c  in CNF:
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨  b^{28, 16}_2
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨  b^{28, 16}_1
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨  p_420 ∨ -b^{28, 16}_0
c  in DIMACS:
-14810  14811 -14812  420  14813 0
-14810  14811 -14812  420  14814 0
-14810  14811 -14812  420 -14815 0

c  -2-1 --> break 
c    ( b^{28, 15}_2 ∧  b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨  b^{28, 15}_0 ∨  p_420 ∨ break
c  in DIMACS:
-14810 -14811  14812  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 15}_2 ∧ -b^{28, 15}_1 ∧ -b^{28, 15}_0 ∧ true) 
c  in CNF:
c    -b^{28, 15}_2 ∨  b^{28, 15}_1 ∨  b^{28, 15}_0 ∨ false 
c  in DIMACS:
-14810  14811  14812  0

c  3 does not represent an automaton state.
c    -(-b^{28, 15}_2 ∧  b^{28, 15}_1 ∧  b^{28, 15}_0 ∧ true) 
c  in CNF:
c     b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ false 
c  in DIMACS:
 14810 -14811 -14812  0
c  -3 does not represent an automaton state.
c    -( b^{28, 15}_2 ∧  b^{28, 15}_1 ∧  b^{28, 15}_0 ∧ true) 
c  in CNF:
c    -b^{28, 15}_2 ∨ -b^{28, 15}_1 ∨ -b^{28, 15}_0 ∨ false 
c  in DIMACS:
-14810 -14811 -14812  0

c i = 16
c  -2+1 --> -1
c    ( b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧  p_448) -> ( b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0)
c  in CNF:
c    -b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨  b^{28, 17}_2
c    -b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_1
c    -b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨  b^{28, 17}_0
c  in DIMACS:
-14813 -14814  14815 -448  14816 0
-14813 -14814  14815 -448 -14817 0
-14813 -14814  14815 -448  14818 0

c  -1+1 --> 0
c    ( b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0 ∧  p_448) -> (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧ -b^{28, 17}_0)
c  in CNF:
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_2
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_1
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_0
c  in DIMACS:
-14813  14814 -14815 -448 -14816 0
-14813  14814 -14815 -448 -14817 0
-14813  14814 -14815 -448 -14818 0

c  0+1 --> 1
c    (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧  p_448) -> (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0)
c  in CNF:
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_2
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_1
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨  b^{28, 17}_0
c  in DIMACS:
 14813  14814  14815 -448 -14816 0
 14813  14814  14815 -448 -14817 0
 14813  14814  14815 -448  14818 0

c  1+1 --> 2
c    (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0 ∧  p_448) -> (-b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0)
c  in CNF:
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_2
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨  b^{28, 17}_1
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ -p_448 ∨ -b^{28, 17}_0
c  in DIMACS:
 14813  14814 -14815 -448 -14816 0
 14813  14814 -14815 -448  14817 0
 14813  14814 -14815 -448 -14818 0

c  2+1 --> break 
c    (-b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧  p_448) -> break
c  in CNF:
c     b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 14813 -14814  14815 -448 1162 0


c  2-1 --> 1
c    (-b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧ -p_448) -> (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0)
c  in CNF:
c     b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_2
c     b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_1
c     b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨  b^{28, 17}_0
c  in DIMACS:
 14813 -14814  14815  448 -14816 0
 14813 -14814  14815  448 -14817 0
 14813 -14814  14815  448  14818 0

c  1-1 --> 0
c    (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0 ∧ -p_448) -> (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧ -b^{28, 17}_0)
c  in CNF:
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_2
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_1
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_0
c  in DIMACS:
 14813  14814 -14815  448 -14816 0
 14813  14814 -14815  448 -14817 0
 14813  14814 -14815  448 -14818 0

c  0-1 --> -1
c    (-b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧ -p_448) -> ( b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0)
c  in CNF:
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨  b^{28, 17}_2
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_1
c     b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨  b^{28, 17}_0
c  in DIMACS:
 14813  14814  14815  448  14816 0
 14813  14814  14815  448 -14817 0
 14813  14814  14815  448  14818 0

c  -1-1 --> -2
c    ( b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧  b^{28, 16}_0 ∧ -p_448) -> ( b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0)
c  in CNF:
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨  b^{28, 17}_2
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨  b^{28, 17}_1
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨  p_448 ∨ -b^{28, 17}_0
c  in DIMACS:
-14813  14814 -14815  448  14816 0
-14813  14814 -14815  448  14817 0
-14813  14814 -14815  448 -14818 0

c  -2-1 --> break 
c    ( b^{28, 16}_2 ∧  b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨  b^{28, 16}_0 ∨  p_448 ∨ break
c  in DIMACS:
-14813 -14814  14815  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 16}_2 ∧ -b^{28, 16}_1 ∧ -b^{28, 16}_0 ∧ true) 
c  in CNF:
c    -b^{28, 16}_2 ∨  b^{28, 16}_1 ∨  b^{28, 16}_0 ∨ false 
c  in DIMACS:
-14813  14814  14815  0

c  3 does not represent an automaton state.
c    -(-b^{28, 16}_2 ∧  b^{28, 16}_1 ∧  b^{28, 16}_0 ∧ true) 
c  in CNF:
c     b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ false 
c  in DIMACS:
 14813 -14814 -14815  0
c  -3 does not represent an automaton state.
c    -( b^{28, 16}_2 ∧  b^{28, 16}_1 ∧  b^{28, 16}_0 ∧ true) 
c  in CNF:
c    -b^{28, 16}_2 ∨ -b^{28, 16}_1 ∨ -b^{28, 16}_0 ∨ false 
c  in DIMACS:
-14813 -14814 -14815  0

c i = 17
c  -2+1 --> -1
c    ( b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧  p_476) -> ( b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0)
c  in CNF:
c    -b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨  b^{28, 18}_2
c    -b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_1
c    -b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨  b^{28, 18}_0
c  in DIMACS:
-14816 -14817  14818 -476  14819 0
-14816 -14817  14818 -476 -14820 0
-14816 -14817  14818 -476  14821 0

c  -1+1 --> 0
c    ( b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0 ∧  p_476) -> (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧ -b^{28, 18}_0)
c  in CNF:
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_2
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_1
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_0
c  in DIMACS:
-14816  14817 -14818 -476 -14819 0
-14816  14817 -14818 -476 -14820 0
-14816  14817 -14818 -476 -14821 0

c  0+1 --> 1
c    (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧  p_476) -> (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0)
c  in CNF:
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_2
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_1
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨  b^{28, 18}_0
c  in DIMACS:
 14816  14817  14818 -476 -14819 0
 14816  14817  14818 -476 -14820 0
 14816  14817  14818 -476  14821 0

c  1+1 --> 2
c    (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0 ∧  p_476) -> (-b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0)
c  in CNF:
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_2
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨  b^{28, 18}_1
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ -p_476 ∨ -b^{28, 18}_0
c  in DIMACS:
 14816  14817 -14818 -476 -14819 0
 14816  14817 -14818 -476  14820 0
 14816  14817 -14818 -476 -14821 0

c  2+1 --> break 
c    (-b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧  p_476) -> break
c  in CNF:
c     b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 14816 -14817  14818 -476 1162 0


c  2-1 --> 1
c    (-b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧ -p_476) -> (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0)
c  in CNF:
c     b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_2
c     b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_1
c     b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨  b^{28, 18}_0
c  in DIMACS:
 14816 -14817  14818  476 -14819 0
 14816 -14817  14818  476 -14820 0
 14816 -14817  14818  476  14821 0

c  1-1 --> 0
c    (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0 ∧ -p_476) -> (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧ -b^{28, 18}_0)
c  in CNF:
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_2
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_1
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_0
c  in DIMACS:
 14816  14817 -14818  476 -14819 0
 14816  14817 -14818  476 -14820 0
 14816  14817 -14818  476 -14821 0

c  0-1 --> -1
c    (-b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧ -p_476) -> ( b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0)
c  in CNF:
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨  b^{28, 18}_2
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_1
c     b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨  b^{28, 18}_0
c  in DIMACS:
 14816  14817  14818  476  14819 0
 14816  14817  14818  476 -14820 0
 14816  14817  14818  476  14821 0

c  -1-1 --> -2
c    ( b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧  b^{28, 17}_0 ∧ -p_476) -> ( b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0)
c  in CNF:
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨  b^{28, 18}_2
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨  b^{28, 18}_1
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨  p_476 ∨ -b^{28, 18}_0
c  in DIMACS:
-14816  14817 -14818  476  14819 0
-14816  14817 -14818  476  14820 0
-14816  14817 -14818  476 -14821 0

c  -2-1 --> break 
c    ( b^{28, 17}_2 ∧  b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨  b^{28, 17}_0 ∨  p_476 ∨ break
c  in DIMACS:
-14816 -14817  14818  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 17}_2 ∧ -b^{28, 17}_1 ∧ -b^{28, 17}_0 ∧ true) 
c  in CNF:
c    -b^{28, 17}_2 ∨  b^{28, 17}_1 ∨  b^{28, 17}_0 ∨ false 
c  in DIMACS:
-14816  14817  14818  0

c  3 does not represent an automaton state.
c    -(-b^{28, 17}_2 ∧  b^{28, 17}_1 ∧  b^{28, 17}_0 ∧ true) 
c  in CNF:
c     b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ false 
c  in DIMACS:
 14816 -14817 -14818  0
c  -3 does not represent an automaton state.
c    -( b^{28, 17}_2 ∧  b^{28, 17}_1 ∧  b^{28, 17}_0 ∧ true) 
c  in CNF:
c    -b^{28, 17}_2 ∨ -b^{28, 17}_1 ∨ -b^{28, 17}_0 ∨ false 
c  in DIMACS:
-14816 -14817 -14818  0

c i = 18
c  -2+1 --> -1
c    ( b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧  p_504) -> ( b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0)
c  in CNF:
c    -b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨  b^{28, 19}_2
c    -b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_1
c    -b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨  b^{28, 19}_0
c  in DIMACS:
-14819 -14820  14821 -504  14822 0
-14819 -14820  14821 -504 -14823 0
-14819 -14820  14821 -504  14824 0

c  -1+1 --> 0
c    ( b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0 ∧  p_504) -> (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧ -b^{28, 19}_0)
c  in CNF:
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_2
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_1
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_0
c  in DIMACS:
-14819  14820 -14821 -504 -14822 0
-14819  14820 -14821 -504 -14823 0
-14819  14820 -14821 -504 -14824 0

c  0+1 --> 1
c    (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧  p_504) -> (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0)
c  in CNF:
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_2
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_1
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨  b^{28, 19}_0
c  in DIMACS:
 14819  14820  14821 -504 -14822 0
 14819  14820  14821 -504 -14823 0
 14819  14820  14821 -504  14824 0

c  1+1 --> 2
c    (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0 ∧  p_504) -> (-b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0)
c  in CNF:
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_2
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨  b^{28, 19}_1
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ -p_504 ∨ -b^{28, 19}_0
c  in DIMACS:
 14819  14820 -14821 -504 -14822 0
 14819  14820 -14821 -504  14823 0
 14819  14820 -14821 -504 -14824 0

c  2+1 --> break 
c    (-b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧  p_504) -> break
c  in CNF:
c     b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 14819 -14820  14821 -504 1162 0


c  2-1 --> 1
c    (-b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧ -p_504) -> (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0)
c  in CNF:
c     b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_2
c     b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_1
c     b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨  b^{28, 19}_0
c  in DIMACS:
 14819 -14820  14821  504 -14822 0
 14819 -14820  14821  504 -14823 0
 14819 -14820  14821  504  14824 0

c  1-1 --> 0
c    (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0 ∧ -p_504) -> (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧ -b^{28, 19}_0)
c  in CNF:
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_2
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_1
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_0
c  in DIMACS:
 14819  14820 -14821  504 -14822 0
 14819  14820 -14821  504 -14823 0
 14819  14820 -14821  504 -14824 0

c  0-1 --> -1
c    (-b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧ -p_504) -> ( b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0)
c  in CNF:
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨  b^{28, 19}_2
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_1
c     b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨  b^{28, 19}_0
c  in DIMACS:
 14819  14820  14821  504  14822 0
 14819  14820  14821  504 -14823 0
 14819  14820  14821  504  14824 0

c  -1-1 --> -2
c    ( b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧  b^{28, 18}_0 ∧ -p_504) -> ( b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0)
c  in CNF:
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨  b^{28, 19}_2
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨  b^{28, 19}_1
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨  p_504 ∨ -b^{28, 19}_0
c  in DIMACS:
-14819  14820 -14821  504  14822 0
-14819  14820 -14821  504  14823 0
-14819  14820 -14821  504 -14824 0

c  -2-1 --> break 
c    ( b^{28, 18}_2 ∧  b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨  b^{28, 18}_0 ∨  p_504 ∨ break
c  in DIMACS:
-14819 -14820  14821  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 18}_2 ∧ -b^{28, 18}_1 ∧ -b^{28, 18}_0 ∧ true) 
c  in CNF:
c    -b^{28, 18}_2 ∨  b^{28, 18}_1 ∨  b^{28, 18}_0 ∨ false 
c  in DIMACS:
-14819  14820  14821  0

c  3 does not represent an automaton state.
c    -(-b^{28, 18}_2 ∧  b^{28, 18}_1 ∧  b^{28, 18}_0 ∧ true) 
c  in CNF:
c     b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ false 
c  in DIMACS:
 14819 -14820 -14821  0
c  -3 does not represent an automaton state.
c    -( b^{28, 18}_2 ∧  b^{28, 18}_1 ∧  b^{28, 18}_0 ∧ true) 
c  in CNF:
c    -b^{28, 18}_2 ∨ -b^{28, 18}_1 ∨ -b^{28, 18}_0 ∨ false 
c  in DIMACS:
-14819 -14820 -14821  0

c i = 19
c  -2+1 --> -1
c    ( b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧  p_532) -> ( b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0)
c  in CNF:
c    -b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨  b^{28, 20}_2
c    -b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_1
c    -b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨  b^{28, 20}_0
c  in DIMACS:
-14822 -14823  14824 -532  14825 0
-14822 -14823  14824 -532 -14826 0
-14822 -14823  14824 -532  14827 0

c  -1+1 --> 0
c    ( b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0 ∧  p_532) -> (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧ -b^{28, 20}_0)
c  in CNF:
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_2
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_1
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_0
c  in DIMACS:
-14822  14823 -14824 -532 -14825 0
-14822  14823 -14824 -532 -14826 0
-14822  14823 -14824 -532 -14827 0

c  0+1 --> 1
c    (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧  p_532) -> (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0)
c  in CNF:
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_2
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_1
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨  b^{28, 20}_0
c  in DIMACS:
 14822  14823  14824 -532 -14825 0
 14822  14823  14824 -532 -14826 0
 14822  14823  14824 -532  14827 0

c  1+1 --> 2
c    (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0 ∧  p_532) -> (-b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0)
c  in CNF:
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_2
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨  b^{28, 20}_1
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ -p_532 ∨ -b^{28, 20}_0
c  in DIMACS:
 14822  14823 -14824 -532 -14825 0
 14822  14823 -14824 -532  14826 0
 14822  14823 -14824 -532 -14827 0

c  2+1 --> break 
c    (-b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧  p_532) -> break
c  in CNF:
c     b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 14822 -14823  14824 -532 1162 0


c  2-1 --> 1
c    (-b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧ -p_532) -> (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0)
c  in CNF:
c     b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_2
c     b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_1
c     b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨  b^{28, 20}_0
c  in DIMACS:
 14822 -14823  14824  532 -14825 0
 14822 -14823  14824  532 -14826 0
 14822 -14823  14824  532  14827 0

c  1-1 --> 0
c    (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0 ∧ -p_532) -> (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧ -b^{28, 20}_0)
c  in CNF:
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_2
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_1
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_0
c  in DIMACS:
 14822  14823 -14824  532 -14825 0
 14822  14823 -14824  532 -14826 0
 14822  14823 -14824  532 -14827 0

c  0-1 --> -1
c    (-b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧ -p_532) -> ( b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0)
c  in CNF:
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨  b^{28, 20}_2
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_1
c     b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨  b^{28, 20}_0
c  in DIMACS:
 14822  14823  14824  532  14825 0
 14822  14823  14824  532 -14826 0
 14822  14823  14824  532  14827 0

c  -1-1 --> -2
c    ( b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧  b^{28, 19}_0 ∧ -p_532) -> ( b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0)
c  in CNF:
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨  b^{28, 20}_2
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨  b^{28, 20}_1
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨  p_532 ∨ -b^{28, 20}_0
c  in DIMACS:
-14822  14823 -14824  532  14825 0
-14822  14823 -14824  532  14826 0
-14822  14823 -14824  532 -14827 0

c  -2-1 --> break 
c    ( b^{28, 19}_2 ∧  b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨  b^{28, 19}_0 ∨  p_532 ∨ break
c  in DIMACS:
-14822 -14823  14824  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 19}_2 ∧ -b^{28, 19}_1 ∧ -b^{28, 19}_0 ∧ true) 
c  in CNF:
c    -b^{28, 19}_2 ∨  b^{28, 19}_1 ∨  b^{28, 19}_0 ∨ false 
c  in DIMACS:
-14822  14823  14824  0

c  3 does not represent an automaton state.
c    -(-b^{28, 19}_2 ∧  b^{28, 19}_1 ∧  b^{28, 19}_0 ∧ true) 
c  in CNF:
c     b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ false 
c  in DIMACS:
 14822 -14823 -14824  0
c  -3 does not represent an automaton state.
c    -( b^{28, 19}_2 ∧  b^{28, 19}_1 ∧  b^{28, 19}_0 ∧ true) 
c  in CNF:
c    -b^{28, 19}_2 ∨ -b^{28, 19}_1 ∨ -b^{28, 19}_0 ∨ false 
c  in DIMACS:
-14822 -14823 -14824  0

c i = 20
c  -2+1 --> -1
c    ( b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧  p_560) -> ( b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0)
c  in CNF:
c    -b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨  b^{28, 21}_2
c    -b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_1
c    -b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨  b^{28, 21}_0
c  in DIMACS:
-14825 -14826  14827 -560  14828 0
-14825 -14826  14827 -560 -14829 0
-14825 -14826  14827 -560  14830 0

c  -1+1 --> 0
c    ( b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0 ∧  p_560) -> (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧ -b^{28, 21}_0)
c  in CNF:
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_2
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_1
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_0
c  in DIMACS:
-14825  14826 -14827 -560 -14828 0
-14825  14826 -14827 -560 -14829 0
-14825  14826 -14827 -560 -14830 0

c  0+1 --> 1
c    (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧  p_560) -> (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0)
c  in CNF:
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_2
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_1
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨  b^{28, 21}_0
c  in DIMACS:
 14825  14826  14827 -560 -14828 0
 14825  14826  14827 -560 -14829 0
 14825  14826  14827 -560  14830 0

c  1+1 --> 2
c    (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0 ∧  p_560) -> (-b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0)
c  in CNF:
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_2
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨  b^{28, 21}_1
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ -p_560 ∨ -b^{28, 21}_0
c  in DIMACS:
 14825  14826 -14827 -560 -14828 0
 14825  14826 -14827 -560  14829 0
 14825  14826 -14827 -560 -14830 0

c  2+1 --> break 
c    (-b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧  p_560) -> break
c  in CNF:
c     b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 14825 -14826  14827 -560 1162 0


c  2-1 --> 1
c    (-b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧ -p_560) -> (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0)
c  in CNF:
c     b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_2
c     b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_1
c     b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨  b^{28, 21}_0
c  in DIMACS:
 14825 -14826  14827  560 -14828 0
 14825 -14826  14827  560 -14829 0
 14825 -14826  14827  560  14830 0

c  1-1 --> 0
c    (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0 ∧ -p_560) -> (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧ -b^{28, 21}_0)
c  in CNF:
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_2
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_1
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_0
c  in DIMACS:
 14825  14826 -14827  560 -14828 0
 14825  14826 -14827  560 -14829 0
 14825  14826 -14827  560 -14830 0

c  0-1 --> -1
c    (-b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧ -p_560) -> ( b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0)
c  in CNF:
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨  b^{28, 21}_2
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_1
c     b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨  b^{28, 21}_0
c  in DIMACS:
 14825  14826  14827  560  14828 0
 14825  14826  14827  560 -14829 0
 14825  14826  14827  560  14830 0

c  -1-1 --> -2
c    ( b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧  b^{28, 20}_0 ∧ -p_560) -> ( b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0)
c  in CNF:
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨  b^{28, 21}_2
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨  b^{28, 21}_1
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨  p_560 ∨ -b^{28, 21}_0
c  in DIMACS:
-14825  14826 -14827  560  14828 0
-14825  14826 -14827  560  14829 0
-14825  14826 -14827  560 -14830 0

c  -2-1 --> break 
c    ( b^{28, 20}_2 ∧  b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨  b^{28, 20}_0 ∨  p_560 ∨ break
c  in DIMACS:
-14825 -14826  14827  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 20}_2 ∧ -b^{28, 20}_1 ∧ -b^{28, 20}_0 ∧ true) 
c  in CNF:
c    -b^{28, 20}_2 ∨  b^{28, 20}_1 ∨  b^{28, 20}_0 ∨ false 
c  in DIMACS:
-14825  14826  14827  0

c  3 does not represent an automaton state.
c    -(-b^{28, 20}_2 ∧  b^{28, 20}_1 ∧  b^{28, 20}_0 ∧ true) 
c  in CNF:
c     b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ false 
c  in DIMACS:
 14825 -14826 -14827  0
c  -3 does not represent an automaton state.
c    -( b^{28, 20}_2 ∧  b^{28, 20}_1 ∧  b^{28, 20}_0 ∧ true) 
c  in CNF:
c    -b^{28, 20}_2 ∨ -b^{28, 20}_1 ∨ -b^{28, 20}_0 ∨ false 
c  in DIMACS:
-14825 -14826 -14827  0

c i = 21
c  -2+1 --> -1
c    ( b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧  p_588) -> ( b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0)
c  in CNF:
c    -b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨  b^{28, 22}_2
c    -b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_1
c    -b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨  b^{28, 22}_0
c  in DIMACS:
-14828 -14829  14830 -588  14831 0
-14828 -14829  14830 -588 -14832 0
-14828 -14829  14830 -588  14833 0

c  -1+1 --> 0
c    ( b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0 ∧  p_588) -> (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧ -b^{28, 22}_0)
c  in CNF:
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_2
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_1
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_0
c  in DIMACS:
-14828  14829 -14830 -588 -14831 0
-14828  14829 -14830 -588 -14832 0
-14828  14829 -14830 -588 -14833 0

c  0+1 --> 1
c    (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧  p_588) -> (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0)
c  in CNF:
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_2
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_1
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨  b^{28, 22}_0
c  in DIMACS:
 14828  14829  14830 -588 -14831 0
 14828  14829  14830 -588 -14832 0
 14828  14829  14830 -588  14833 0

c  1+1 --> 2
c    (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0 ∧  p_588) -> (-b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0)
c  in CNF:
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_2
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨  b^{28, 22}_1
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ -p_588 ∨ -b^{28, 22}_0
c  in DIMACS:
 14828  14829 -14830 -588 -14831 0
 14828  14829 -14830 -588  14832 0
 14828  14829 -14830 -588 -14833 0

c  2+1 --> break 
c    (-b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧  p_588) -> break
c  in CNF:
c     b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 14828 -14829  14830 -588 1162 0


c  2-1 --> 1
c    (-b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧ -p_588) -> (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0)
c  in CNF:
c     b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_2
c     b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_1
c     b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨  b^{28, 22}_0
c  in DIMACS:
 14828 -14829  14830  588 -14831 0
 14828 -14829  14830  588 -14832 0
 14828 -14829  14830  588  14833 0

c  1-1 --> 0
c    (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0 ∧ -p_588) -> (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧ -b^{28, 22}_0)
c  in CNF:
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_2
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_1
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_0
c  in DIMACS:
 14828  14829 -14830  588 -14831 0
 14828  14829 -14830  588 -14832 0
 14828  14829 -14830  588 -14833 0

c  0-1 --> -1
c    (-b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧ -p_588) -> ( b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0)
c  in CNF:
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨  b^{28, 22}_2
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_1
c     b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨  b^{28, 22}_0
c  in DIMACS:
 14828  14829  14830  588  14831 0
 14828  14829  14830  588 -14832 0
 14828  14829  14830  588  14833 0

c  -1-1 --> -2
c    ( b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧  b^{28, 21}_0 ∧ -p_588) -> ( b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0)
c  in CNF:
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨  b^{28, 22}_2
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨  b^{28, 22}_1
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨  p_588 ∨ -b^{28, 22}_0
c  in DIMACS:
-14828  14829 -14830  588  14831 0
-14828  14829 -14830  588  14832 0
-14828  14829 -14830  588 -14833 0

c  -2-1 --> break 
c    ( b^{28, 21}_2 ∧  b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨  b^{28, 21}_0 ∨  p_588 ∨ break
c  in DIMACS:
-14828 -14829  14830  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 21}_2 ∧ -b^{28, 21}_1 ∧ -b^{28, 21}_0 ∧ true) 
c  in CNF:
c    -b^{28, 21}_2 ∨  b^{28, 21}_1 ∨  b^{28, 21}_0 ∨ false 
c  in DIMACS:
-14828  14829  14830  0

c  3 does not represent an automaton state.
c    -(-b^{28, 21}_2 ∧  b^{28, 21}_1 ∧  b^{28, 21}_0 ∧ true) 
c  in CNF:
c     b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ false 
c  in DIMACS:
 14828 -14829 -14830  0
c  -3 does not represent an automaton state.
c    -( b^{28, 21}_2 ∧  b^{28, 21}_1 ∧  b^{28, 21}_0 ∧ true) 
c  in CNF:
c    -b^{28, 21}_2 ∨ -b^{28, 21}_1 ∨ -b^{28, 21}_0 ∨ false 
c  in DIMACS:
-14828 -14829 -14830  0

c i = 22
c  -2+1 --> -1
c    ( b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧  p_616) -> ( b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0)
c  in CNF:
c    -b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨  b^{28, 23}_2
c    -b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_1
c    -b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨  b^{28, 23}_0
c  in DIMACS:
-14831 -14832  14833 -616  14834 0
-14831 -14832  14833 -616 -14835 0
-14831 -14832  14833 -616  14836 0

c  -1+1 --> 0
c    ( b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0 ∧  p_616) -> (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧ -b^{28, 23}_0)
c  in CNF:
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_2
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_1
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_0
c  in DIMACS:
-14831  14832 -14833 -616 -14834 0
-14831  14832 -14833 -616 -14835 0
-14831  14832 -14833 -616 -14836 0

c  0+1 --> 1
c    (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧  p_616) -> (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0)
c  in CNF:
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_2
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_1
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨  b^{28, 23}_0
c  in DIMACS:
 14831  14832  14833 -616 -14834 0
 14831  14832  14833 -616 -14835 0
 14831  14832  14833 -616  14836 0

c  1+1 --> 2
c    (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0 ∧  p_616) -> (-b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0)
c  in CNF:
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_2
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨  b^{28, 23}_1
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ -p_616 ∨ -b^{28, 23}_0
c  in DIMACS:
 14831  14832 -14833 -616 -14834 0
 14831  14832 -14833 -616  14835 0
 14831  14832 -14833 -616 -14836 0

c  2+1 --> break 
c    (-b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧  p_616) -> break
c  in CNF:
c     b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 14831 -14832  14833 -616 1162 0


c  2-1 --> 1
c    (-b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧ -p_616) -> (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0)
c  in CNF:
c     b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_2
c     b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_1
c     b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨  b^{28, 23}_0
c  in DIMACS:
 14831 -14832  14833  616 -14834 0
 14831 -14832  14833  616 -14835 0
 14831 -14832  14833  616  14836 0

c  1-1 --> 0
c    (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0 ∧ -p_616) -> (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧ -b^{28, 23}_0)
c  in CNF:
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_2
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_1
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_0
c  in DIMACS:
 14831  14832 -14833  616 -14834 0
 14831  14832 -14833  616 -14835 0
 14831  14832 -14833  616 -14836 0

c  0-1 --> -1
c    (-b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧ -p_616) -> ( b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0)
c  in CNF:
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨  b^{28, 23}_2
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_1
c     b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨  b^{28, 23}_0
c  in DIMACS:
 14831  14832  14833  616  14834 0
 14831  14832  14833  616 -14835 0
 14831  14832  14833  616  14836 0

c  -1-1 --> -2
c    ( b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧  b^{28, 22}_0 ∧ -p_616) -> ( b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0)
c  in CNF:
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨  b^{28, 23}_2
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨  b^{28, 23}_1
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨  p_616 ∨ -b^{28, 23}_0
c  in DIMACS:
-14831  14832 -14833  616  14834 0
-14831  14832 -14833  616  14835 0
-14831  14832 -14833  616 -14836 0

c  -2-1 --> break 
c    ( b^{28, 22}_2 ∧  b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨  b^{28, 22}_0 ∨  p_616 ∨ break
c  in DIMACS:
-14831 -14832  14833  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 22}_2 ∧ -b^{28, 22}_1 ∧ -b^{28, 22}_0 ∧ true) 
c  in CNF:
c    -b^{28, 22}_2 ∨  b^{28, 22}_1 ∨  b^{28, 22}_0 ∨ false 
c  in DIMACS:
-14831  14832  14833  0

c  3 does not represent an automaton state.
c    -(-b^{28, 22}_2 ∧  b^{28, 22}_1 ∧  b^{28, 22}_0 ∧ true) 
c  in CNF:
c     b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ false 
c  in DIMACS:
 14831 -14832 -14833  0
c  -3 does not represent an automaton state.
c    -( b^{28, 22}_2 ∧  b^{28, 22}_1 ∧  b^{28, 22}_0 ∧ true) 
c  in CNF:
c    -b^{28, 22}_2 ∨ -b^{28, 22}_1 ∨ -b^{28, 22}_0 ∨ false 
c  in DIMACS:
-14831 -14832 -14833  0

c i = 23
c  -2+1 --> -1
c    ( b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧  p_644) -> ( b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0)
c  in CNF:
c    -b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨  b^{28, 24}_2
c    -b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_1
c    -b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨  b^{28, 24}_0
c  in DIMACS:
-14834 -14835  14836 -644  14837 0
-14834 -14835  14836 -644 -14838 0
-14834 -14835  14836 -644  14839 0

c  -1+1 --> 0
c    ( b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0 ∧  p_644) -> (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧ -b^{28, 24}_0)
c  in CNF:
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_2
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_1
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_0
c  in DIMACS:
-14834  14835 -14836 -644 -14837 0
-14834  14835 -14836 -644 -14838 0
-14834  14835 -14836 -644 -14839 0

c  0+1 --> 1
c    (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧  p_644) -> (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0)
c  in CNF:
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_2
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_1
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨  b^{28, 24}_0
c  in DIMACS:
 14834  14835  14836 -644 -14837 0
 14834  14835  14836 -644 -14838 0
 14834  14835  14836 -644  14839 0

c  1+1 --> 2
c    (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0 ∧  p_644) -> (-b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0)
c  in CNF:
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_2
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨  b^{28, 24}_1
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ -p_644 ∨ -b^{28, 24}_0
c  in DIMACS:
 14834  14835 -14836 -644 -14837 0
 14834  14835 -14836 -644  14838 0
 14834  14835 -14836 -644 -14839 0

c  2+1 --> break 
c    (-b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧  p_644) -> break
c  in CNF:
c     b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 14834 -14835  14836 -644 1162 0


c  2-1 --> 1
c    (-b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧ -p_644) -> (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0)
c  in CNF:
c     b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_2
c     b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_1
c     b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨  b^{28, 24}_0
c  in DIMACS:
 14834 -14835  14836  644 -14837 0
 14834 -14835  14836  644 -14838 0
 14834 -14835  14836  644  14839 0

c  1-1 --> 0
c    (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0 ∧ -p_644) -> (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧ -b^{28, 24}_0)
c  in CNF:
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_2
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_1
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_0
c  in DIMACS:
 14834  14835 -14836  644 -14837 0
 14834  14835 -14836  644 -14838 0
 14834  14835 -14836  644 -14839 0

c  0-1 --> -1
c    (-b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧ -p_644) -> ( b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0)
c  in CNF:
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨  b^{28, 24}_2
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_1
c     b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨  b^{28, 24}_0
c  in DIMACS:
 14834  14835  14836  644  14837 0
 14834  14835  14836  644 -14838 0
 14834  14835  14836  644  14839 0

c  -1-1 --> -2
c    ( b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧  b^{28, 23}_0 ∧ -p_644) -> ( b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0)
c  in CNF:
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨  b^{28, 24}_2
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨  b^{28, 24}_1
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨  p_644 ∨ -b^{28, 24}_0
c  in DIMACS:
-14834  14835 -14836  644  14837 0
-14834  14835 -14836  644  14838 0
-14834  14835 -14836  644 -14839 0

c  -2-1 --> break 
c    ( b^{28, 23}_2 ∧  b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨  b^{28, 23}_0 ∨  p_644 ∨ break
c  in DIMACS:
-14834 -14835  14836  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 23}_2 ∧ -b^{28, 23}_1 ∧ -b^{28, 23}_0 ∧ true) 
c  in CNF:
c    -b^{28, 23}_2 ∨  b^{28, 23}_1 ∨  b^{28, 23}_0 ∨ false 
c  in DIMACS:
-14834  14835  14836  0

c  3 does not represent an automaton state.
c    -(-b^{28, 23}_2 ∧  b^{28, 23}_1 ∧  b^{28, 23}_0 ∧ true) 
c  in CNF:
c     b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ false 
c  in DIMACS:
 14834 -14835 -14836  0
c  -3 does not represent an automaton state.
c    -( b^{28, 23}_2 ∧  b^{28, 23}_1 ∧  b^{28, 23}_0 ∧ true) 
c  in CNF:
c    -b^{28, 23}_2 ∨ -b^{28, 23}_1 ∨ -b^{28, 23}_0 ∨ false 
c  in DIMACS:
-14834 -14835 -14836  0

c i = 24
c  -2+1 --> -1
c    ( b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧  p_672) -> ( b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0)
c  in CNF:
c    -b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨  b^{28, 25}_2
c    -b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_1
c    -b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨  b^{28, 25}_0
c  in DIMACS:
-14837 -14838  14839 -672  14840 0
-14837 -14838  14839 -672 -14841 0
-14837 -14838  14839 -672  14842 0

c  -1+1 --> 0
c    ( b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0 ∧  p_672) -> (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧ -b^{28, 25}_0)
c  in CNF:
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_2
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_1
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_0
c  in DIMACS:
-14837  14838 -14839 -672 -14840 0
-14837  14838 -14839 -672 -14841 0
-14837  14838 -14839 -672 -14842 0

c  0+1 --> 1
c    (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧  p_672) -> (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0)
c  in CNF:
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_2
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_1
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨  b^{28, 25}_0
c  in DIMACS:
 14837  14838  14839 -672 -14840 0
 14837  14838  14839 -672 -14841 0
 14837  14838  14839 -672  14842 0

c  1+1 --> 2
c    (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0 ∧  p_672) -> (-b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0)
c  in CNF:
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_2
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨  b^{28, 25}_1
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ -p_672 ∨ -b^{28, 25}_0
c  in DIMACS:
 14837  14838 -14839 -672 -14840 0
 14837  14838 -14839 -672  14841 0
 14837  14838 -14839 -672 -14842 0

c  2+1 --> break 
c    (-b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧  p_672) -> break
c  in CNF:
c     b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 14837 -14838  14839 -672 1162 0


c  2-1 --> 1
c    (-b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧ -p_672) -> (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0)
c  in CNF:
c     b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_2
c     b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_1
c     b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨  b^{28, 25}_0
c  in DIMACS:
 14837 -14838  14839  672 -14840 0
 14837 -14838  14839  672 -14841 0
 14837 -14838  14839  672  14842 0

c  1-1 --> 0
c    (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0 ∧ -p_672) -> (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧ -b^{28, 25}_0)
c  in CNF:
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_2
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_1
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_0
c  in DIMACS:
 14837  14838 -14839  672 -14840 0
 14837  14838 -14839  672 -14841 0
 14837  14838 -14839  672 -14842 0

c  0-1 --> -1
c    (-b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧ -p_672) -> ( b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0)
c  in CNF:
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨  b^{28, 25}_2
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_1
c     b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨  b^{28, 25}_0
c  in DIMACS:
 14837  14838  14839  672  14840 0
 14837  14838  14839  672 -14841 0
 14837  14838  14839  672  14842 0

c  -1-1 --> -2
c    ( b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧  b^{28, 24}_0 ∧ -p_672) -> ( b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0)
c  in CNF:
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨  b^{28, 25}_2
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨  b^{28, 25}_1
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨  p_672 ∨ -b^{28, 25}_0
c  in DIMACS:
-14837  14838 -14839  672  14840 0
-14837  14838 -14839  672  14841 0
-14837  14838 -14839  672 -14842 0

c  -2-1 --> break 
c    ( b^{28, 24}_2 ∧  b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨  b^{28, 24}_0 ∨  p_672 ∨ break
c  in DIMACS:
-14837 -14838  14839  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 24}_2 ∧ -b^{28, 24}_1 ∧ -b^{28, 24}_0 ∧ true) 
c  in CNF:
c    -b^{28, 24}_2 ∨  b^{28, 24}_1 ∨  b^{28, 24}_0 ∨ false 
c  in DIMACS:
-14837  14838  14839  0

c  3 does not represent an automaton state.
c    -(-b^{28, 24}_2 ∧  b^{28, 24}_1 ∧  b^{28, 24}_0 ∧ true) 
c  in CNF:
c     b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ false 
c  in DIMACS:
 14837 -14838 -14839  0
c  -3 does not represent an automaton state.
c    -( b^{28, 24}_2 ∧  b^{28, 24}_1 ∧  b^{28, 24}_0 ∧ true) 
c  in CNF:
c    -b^{28, 24}_2 ∨ -b^{28, 24}_1 ∨ -b^{28, 24}_0 ∨ false 
c  in DIMACS:
-14837 -14838 -14839  0

c i = 25
c  -2+1 --> -1
c    ( b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧  p_700) -> ( b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0)
c  in CNF:
c    -b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨  b^{28, 26}_2
c    -b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_1
c    -b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨  b^{28, 26}_0
c  in DIMACS:
-14840 -14841  14842 -700  14843 0
-14840 -14841  14842 -700 -14844 0
-14840 -14841  14842 -700  14845 0

c  -1+1 --> 0
c    ( b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0 ∧  p_700) -> (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧ -b^{28, 26}_0)
c  in CNF:
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_2
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_1
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_0
c  in DIMACS:
-14840  14841 -14842 -700 -14843 0
-14840  14841 -14842 -700 -14844 0
-14840  14841 -14842 -700 -14845 0

c  0+1 --> 1
c    (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧  p_700) -> (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0)
c  in CNF:
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_2
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_1
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨  b^{28, 26}_0
c  in DIMACS:
 14840  14841  14842 -700 -14843 0
 14840  14841  14842 -700 -14844 0
 14840  14841  14842 -700  14845 0

c  1+1 --> 2
c    (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0 ∧  p_700) -> (-b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0)
c  in CNF:
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_2
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨  b^{28, 26}_1
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ -p_700 ∨ -b^{28, 26}_0
c  in DIMACS:
 14840  14841 -14842 -700 -14843 0
 14840  14841 -14842 -700  14844 0
 14840  14841 -14842 -700 -14845 0

c  2+1 --> break 
c    (-b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧  p_700) -> break
c  in CNF:
c     b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 14840 -14841  14842 -700 1162 0


c  2-1 --> 1
c    (-b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧ -p_700) -> (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0)
c  in CNF:
c     b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_2
c     b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_1
c     b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨  b^{28, 26}_0
c  in DIMACS:
 14840 -14841  14842  700 -14843 0
 14840 -14841  14842  700 -14844 0
 14840 -14841  14842  700  14845 0

c  1-1 --> 0
c    (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0 ∧ -p_700) -> (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧ -b^{28, 26}_0)
c  in CNF:
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_2
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_1
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_0
c  in DIMACS:
 14840  14841 -14842  700 -14843 0
 14840  14841 -14842  700 -14844 0
 14840  14841 -14842  700 -14845 0

c  0-1 --> -1
c    (-b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧ -p_700) -> ( b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0)
c  in CNF:
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨  b^{28, 26}_2
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_1
c     b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨  b^{28, 26}_0
c  in DIMACS:
 14840  14841  14842  700  14843 0
 14840  14841  14842  700 -14844 0
 14840  14841  14842  700  14845 0

c  -1-1 --> -2
c    ( b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧  b^{28, 25}_0 ∧ -p_700) -> ( b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0)
c  in CNF:
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨  b^{28, 26}_2
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨  b^{28, 26}_1
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨  p_700 ∨ -b^{28, 26}_0
c  in DIMACS:
-14840  14841 -14842  700  14843 0
-14840  14841 -14842  700  14844 0
-14840  14841 -14842  700 -14845 0

c  -2-1 --> break 
c    ( b^{28, 25}_2 ∧  b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨  b^{28, 25}_0 ∨  p_700 ∨ break
c  in DIMACS:
-14840 -14841  14842  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 25}_2 ∧ -b^{28, 25}_1 ∧ -b^{28, 25}_0 ∧ true) 
c  in CNF:
c    -b^{28, 25}_2 ∨  b^{28, 25}_1 ∨  b^{28, 25}_0 ∨ false 
c  in DIMACS:
-14840  14841  14842  0

c  3 does not represent an automaton state.
c    -(-b^{28, 25}_2 ∧  b^{28, 25}_1 ∧  b^{28, 25}_0 ∧ true) 
c  in CNF:
c     b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ false 
c  in DIMACS:
 14840 -14841 -14842  0
c  -3 does not represent an automaton state.
c    -( b^{28, 25}_2 ∧  b^{28, 25}_1 ∧  b^{28, 25}_0 ∧ true) 
c  in CNF:
c    -b^{28, 25}_2 ∨ -b^{28, 25}_1 ∨ -b^{28, 25}_0 ∨ false 
c  in DIMACS:
-14840 -14841 -14842  0

c i = 26
c  -2+1 --> -1
c    ( b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧  p_728) -> ( b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0)
c  in CNF:
c    -b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨  b^{28, 27}_2
c    -b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_1
c    -b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨  b^{28, 27}_0
c  in DIMACS:
-14843 -14844  14845 -728  14846 0
-14843 -14844  14845 -728 -14847 0
-14843 -14844  14845 -728  14848 0

c  -1+1 --> 0
c    ( b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0 ∧  p_728) -> (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧ -b^{28, 27}_0)
c  in CNF:
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_2
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_1
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_0
c  in DIMACS:
-14843  14844 -14845 -728 -14846 0
-14843  14844 -14845 -728 -14847 0
-14843  14844 -14845 -728 -14848 0

c  0+1 --> 1
c    (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧  p_728) -> (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0)
c  in CNF:
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_2
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_1
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨  b^{28, 27}_0
c  in DIMACS:
 14843  14844  14845 -728 -14846 0
 14843  14844  14845 -728 -14847 0
 14843  14844  14845 -728  14848 0

c  1+1 --> 2
c    (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0 ∧  p_728) -> (-b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0)
c  in CNF:
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_2
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨  b^{28, 27}_1
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ -p_728 ∨ -b^{28, 27}_0
c  in DIMACS:
 14843  14844 -14845 -728 -14846 0
 14843  14844 -14845 -728  14847 0
 14843  14844 -14845 -728 -14848 0

c  2+1 --> break 
c    (-b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧  p_728) -> break
c  in CNF:
c     b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 14843 -14844  14845 -728 1162 0


c  2-1 --> 1
c    (-b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧ -p_728) -> (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0)
c  in CNF:
c     b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_2
c     b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_1
c     b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨  b^{28, 27}_0
c  in DIMACS:
 14843 -14844  14845  728 -14846 0
 14843 -14844  14845  728 -14847 0
 14843 -14844  14845  728  14848 0

c  1-1 --> 0
c    (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0 ∧ -p_728) -> (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧ -b^{28, 27}_0)
c  in CNF:
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_2
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_1
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_0
c  in DIMACS:
 14843  14844 -14845  728 -14846 0
 14843  14844 -14845  728 -14847 0
 14843  14844 -14845  728 -14848 0

c  0-1 --> -1
c    (-b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧ -p_728) -> ( b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0)
c  in CNF:
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨  b^{28, 27}_2
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_1
c     b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨  b^{28, 27}_0
c  in DIMACS:
 14843  14844  14845  728  14846 0
 14843  14844  14845  728 -14847 0
 14843  14844  14845  728  14848 0

c  -1-1 --> -2
c    ( b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧  b^{28, 26}_0 ∧ -p_728) -> ( b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0)
c  in CNF:
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨  b^{28, 27}_2
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨  b^{28, 27}_1
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨  p_728 ∨ -b^{28, 27}_0
c  in DIMACS:
-14843  14844 -14845  728  14846 0
-14843  14844 -14845  728  14847 0
-14843  14844 -14845  728 -14848 0

c  -2-1 --> break 
c    ( b^{28, 26}_2 ∧  b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨  b^{28, 26}_0 ∨  p_728 ∨ break
c  in DIMACS:
-14843 -14844  14845  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 26}_2 ∧ -b^{28, 26}_1 ∧ -b^{28, 26}_0 ∧ true) 
c  in CNF:
c    -b^{28, 26}_2 ∨  b^{28, 26}_1 ∨  b^{28, 26}_0 ∨ false 
c  in DIMACS:
-14843  14844  14845  0

c  3 does not represent an automaton state.
c    -(-b^{28, 26}_2 ∧  b^{28, 26}_1 ∧  b^{28, 26}_0 ∧ true) 
c  in CNF:
c     b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ false 
c  in DIMACS:
 14843 -14844 -14845  0
c  -3 does not represent an automaton state.
c    -( b^{28, 26}_2 ∧  b^{28, 26}_1 ∧  b^{28, 26}_0 ∧ true) 
c  in CNF:
c    -b^{28, 26}_2 ∨ -b^{28, 26}_1 ∨ -b^{28, 26}_0 ∨ false 
c  in DIMACS:
-14843 -14844 -14845  0

c i = 27
c  -2+1 --> -1
c    ( b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧  p_756) -> ( b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0)
c  in CNF:
c    -b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨  b^{28, 28}_2
c    -b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_1
c    -b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨  b^{28, 28}_0
c  in DIMACS:
-14846 -14847  14848 -756  14849 0
-14846 -14847  14848 -756 -14850 0
-14846 -14847  14848 -756  14851 0

c  -1+1 --> 0
c    ( b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0 ∧  p_756) -> (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧ -b^{28, 28}_0)
c  in CNF:
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_2
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_1
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_0
c  in DIMACS:
-14846  14847 -14848 -756 -14849 0
-14846  14847 -14848 -756 -14850 0
-14846  14847 -14848 -756 -14851 0

c  0+1 --> 1
c    (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧  p_756) -> (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0)
c  in CNF:
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_2
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_1
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨  b^{28, 28}_0
c  in DIMACS:
 14846  14847  14848 -756 -14849 0
 14846  14847  14848 -756 -14850 0
 14846  14847  14848 -756  14851 0

c  1+1 --> 2
c    (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0 ∧  p_756) -> (-b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0)
c  in CNF:
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_2
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨  b^{28, 28}_1
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ -p_756 ∨ -b^{28, 28}_0
c  in DIMACS:
 14846  14847 -14848 -756 -14849 0
 14846  14847 -14848 -756  14850 0
 14846  14847 -14848 -756 -14851 0

c  2+1 --> break 
c    (-b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧  p_756) -> break
c  in CNF:
c     b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 14846 -14847  14848 -756 1162 0


c  2-1 --> 1
c    (-b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧ -p_756) -> (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0)
c  in CNF:
c     b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_2
c     b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_1
c     b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨  b^{28, 28}_0
c  in DIMACS:
 14846 -14847  14848  756 -14849 0
 14846 -14847  14848  756 -14850 0
 14846 -14847  14848  756  14851 0

c  1-1 --> 0
c    (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0 ∧ -p_756) -> (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧ -b^{28, 28}_0)
c  in CNF:
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_2
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_1
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_0
c  in DIMACS:
 14846  14847 -14848  756 -14849 0
 14846  14847 -14848  756 -14850 0
 14846  14847 -14848  756 -14851 0

c  0-1 --> -1
c    (-b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧ -p_756) -> ( b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0)
c  in CNF:
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨  b^{28, 28}_2
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_1
c     b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨  b^{28, 28}_0
c  in DIMACS:
 14846  14847  14848  756  14849 0
 14846  14847  14848  756 -14850 0
 14846  14847  14848  756  14851 0

c  -1-1 --> -2
c    ( b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧  b^{28, 27}_0 ∧ -p_756) -> ( b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0)
c  in CNF:
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨  b^{28, 28}_2
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨  b^{28, 28}_1
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨  p_756 ∨ -b^{28, 28}_0
c  in DIMACS:
-14846  14847 -14848  756  14849 0
-14846  14847 -14848  756  14850 0
-14846  14847 -14848  756 -14851 0

c  -2-1 --> break 
c    ( b^{28, 27}_2 ∧  b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨  b^{28, 27}_0 ∨  p_756 ∨ break
c  in DIMACS:
-14846 -14847  14848  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 27}_2 ∧ -b^{28, 27}_1 ∧ -b^{28, 27}_0 ∧ true) 
c  in CNF:
c    -b^{28, 27}_2 ∨  b^{28, 27}_1 ∨  b^{28, 27}_0 ∨ false 
c  in DIMACS:
-14846  14847  14848  0

c  3 does not represent an automaton state.
c    -(-b^{28, 27}_2 ∧  b^{28, 27}_1 ∧  b^{28, 27}_0 ∧ true) 
c  in CNF:
c     b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ false 
c  in DIMACS:
 14846 -14847 -14848  0
c  -3 does not represent an automaton state.
c    -( b^{28, 27}_2 ∧  b^{28, 27}_1 ∧  b^{28, 27}_0 ∧ true) 
c  in CNF:
c    -b^{28, 27}_2 ∨ -b^{28, 27}_1 ∨ -b^{28, 27}_0 ∨ false 
c  in DIMACS:
-14846 -14847 -14848  0

c i = 28
c  -2+1 --> -1
c    ( b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧  p_784) -> ( b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0)
c  in CNF:
c    -b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨  b^{28, 29}_2
c    -b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_1
c    -b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨  b^{28, 29}_0
c  in DIMACS:
-14849 -14850  14851 -784  14852 0
-14849 -14850  14851 -784 -14853 0
-14849 -14850  14851 -784  14854 0

c  -1+1 --> 0
c    ( b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0 ∧  p_784) -> (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧ -b^{28, 29}_0)
c  in CNF:
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_2
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_1
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_0
c  in DIMACS:
-14849  14850 -14851 -784 -14852 0
-14849  14850 -14851 -784 -14853 0
-14849  14850 -14851 -784 -14854 0

c  0+1 --> 1
c    (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧  p_784) -> (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0)
c  in CNF:
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_2
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_1
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨  b^{28, 29}_0
c  in DIMACS:
 14849  14850  14851 -784 -14852 0
 14849  14850  14851 -784 -14853 0
 14849  14850  14851 -784  14854 0

c  1+1 --> 2
c    (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0 ∧  p_784) -> (-b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0)
c  in CNF:
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_2
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨  b^{28, 29}_1
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ -p_784 ∨ -b^{28, 29}_0
c  in DIMACS:
 14849  14850 -14851 -784 -14852 0
 14849  14850 -14851 -784  14853 0
 14849  14850 -14851 -784 -14854 0

c  2+1 --> break 
c    (-b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧  p_784) -> break
c  in CNF:
c     b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 14849 -14850  14851 -784 1162 0


c  2-1 --> 1
c    (-b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧ -p_784) -> (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0)
c  in CNF:
c     b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_2
c     b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_1
c     b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨  b^{28, 29}_0
c  in DIMACS:
 14849 -14850  14851  784 -14852 0
 14849 -14850  14851  784 -14853 0
 14849 -14850  14851  784  14854 0

c  1-1 --> 0
c    (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0 ∧ -p_784) -> (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧ -b^{28, 29}_0)
c  in CNF:
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_2
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_1
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_0
c  in DIMACS:
 14849  14850 -14851  784 -14852 0
 14849  14850 -14851  784 -14853 0
 14849  14850 -14851  784 -14854 0

c  0-1 --> -1
c    (-b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧ -p_784) -> ( b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0)
c  in CNF:
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨  b^{28, 29}_2
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_1
c     b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨  b^{28, 29}_0
c  in DIMACS:
 14849  14850  14851  784  14852 0
 14849  14850  14851  784 -14853 0
 14849  14850  14851  784  14854 0

c  -1-1 --> -2
c    ( b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧  b^{28, 28}_0 ∧ -p_784) -> ( b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0)
c  in CNF:
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨  b^{28, 29}_2
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨  b^{28, 29}_1
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨  p_784 ∨ -b^{28, 29}_0
c  in DIMACS:
-14849  14850 -14851  784  14852 0
-14849  14850 -14851  784  14853 0
-14849  14850 -14851  784 -14854 0

c  -2-1 --> break 
c    ( b^{28, 28}_2 ∧  b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨  b^{28, 28}_0 ∨  p_784 ∨ break
c  in DIMACS:
-14849 -14850  14851  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 28}_2 ∧ -b^{28, 28}_1 ∧ -b^{28, 28}_0 ∧ true) 
c  in CNF:
c    -b^{28, 28}_2 ∨  b^{28, 28}_1 ∨  b^{28, 28}_0 ∨ false 
c  in DIMACS:
-14849  14850  14851  0

c  3 does not represent an automaton state.
c    -(-b^{28, 28}_2 ∧  b^{28, 28}_1 ∧  b^{28, 28}_0 ∧ true) 
c  in CNF:
c     b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ false 
c  in DIMACS:
 14849 -14850 -14851  0
c  -3 does not represent an automaton state.
c    -( b^{28, 28}_2 ∧  b^{28, 28}_1 ∧  b^{28, 28}_0 ∧ true) 
c  in CNF:
c    -b^{28, 28}_2 ∨ -b^{28, 28}_1 ∨ -b^{28, 28}_0 ∨ false 
c  in DIMACS:
-14849 -14850 -14851  0

c i = 29
c  -2+1 --> -1
c    ( b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧  p_812) -> ( b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0)
c  in CNF:
c    -b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨  b^{28, 30}_2
c    -b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_1
c    -b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨  b^{28, 30}_0
c  in DIMACS:
-14852 -14853  14854 -812  14855 0
-14852 -14853  14854 -812 -14856 0
-14852 -14853  14854 -812  14857 0

c  -1+1 --> 0
c    ( b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0 ∧  p_812) -> (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧ -b^{28, 30}_0)
c  in CNF:
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_2
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_1
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_0
c  in DIMACS:
-14852  14853 -14854 -812 -14855 0
-14852  14853 -14854 -812 -14856 0
-14852  14853 -14854 -812 -14857 0

c  0+1 --> 1
c    (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧  p_812) -> (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0)
c  in CNF:
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_2
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_1
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨  b^{28, 30}_0
c  in DIMACS:
 14852  14853  14854 -812 -14855 0
 14852  14853  14854 -812 -14856 0
 14852  14853  14854 -812  14857 0

c  1+1 --> 2
c    (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0 ∧  p_812) -> (-b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0)
c  in CNF:
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_2
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨  b^{28, 30}_1
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ -p_812 ∨ -b^{28, 30}_0
c  in DIMACS:
 14852  14853 -14854 -812 -14855 0
 14852  14853 -14854 -812  14856 0
 14852  14853 -14854 -812 -14857 0

c  2+1 --> break 
c    (-b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧  p_812) -> break
c  in CNF:
c     b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 14852 -14853  14854 -812 1162 0


c  2-1 --> 1
c    (-b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧ -p_812) -> (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0)
c  in CNF:
c     b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_2
c     b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_1
c     b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨  b^{28, 30}_0
c  in DIMACS:
 14852 -14853  14854  812 -14855 0
 14852 -14853  14854  812 -14856 0
 14852 -14853  14854  812  14857 0

c  1-1 --> 0
c    (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0 ∧ -p_812) -> (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧ -b^{28, 30}_0)
c  in CNF:
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_2
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_1
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_0
c  in DIMACS:
 14852  14853 -14854  812 -14855 0
 14852  14853 -14854  812 -14856 0
 14852  14853 -14854  812 -14857 0

c  0-1 --> -1
c    (-b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧ -p_812) -> ( b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0)
c  in CNF:
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨  b^{28, 30}_2
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_1
c     b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨  b^{28, 30}_0
c  in DIMACS:
 14852  14853  14854  812  14855 0
 14852  14853  14854  812 -14856 0
 14852  14853  14854  812  14857 0

c  -1-1 --> -2
c    ( b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧  b^{28, 29}_0 ∧ -p_812) -> ( b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0)
c  in CNF:
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨  b^{28, 30}_2
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨  b^{28, 30}_1
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨  p_812 ∨ -b^{28, 30}_0
c  in DIMACS:
-14852  14853 -14854  812  14855 0
-14852  14853 -14854  812  14856 0
-14852  14853 -14854  812 -14857 0

c  -2-1 --> break 
c    ( b^{28, 29}_2 ∧  b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨  b^{28, 29}_0 ∨  p_812 ∨ break
c  in DIMACS:
-14852 -14853  14854  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 29}_2 ∧ -b^{28, 29}_1 ∧ -b^{28, 29}_0 ∧ true) 
c  in CNF:
c    -b^{28, 29}_2 ∨  b^{28, 29}_1 ∨  b^{28, 29}_0 ∨ false 
c  in DIMACS:
-14852  14853  14854  0

c  3 does not represent an automaton state.
c    -(-b^{28, 29}_2 ∧  b^{28, 29}_1 ∧  b^{28, 29}_0 ∧ true) 
c  in CNF:
c     b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ false 
c  in DIMACS:
 14852 -14853 -14854  0
c  -3 does not represent an automaton state.
c    -( b^{28, 29}_2 ∧  b^{28, 29}_1 ∧  b^{28, 29}_0 ∧ true) 
c  in CNF:
c    -b^{28, 29}_2 ∨ -b^{28, 29}_1 ∨ -b^{28, 29}_0 ∨ false 
c  in DIMACS:
-14852 -14853 -14854  0

c i = 30
c  -2+1 --> -1
c    ( b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧  p_840) -> ( b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0)
c  in CNF:
c    -b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨  b^{28, 31}_2
c    -b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_1
c    -b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨  b^{28, 31}_0
c  in DIMACS:
-14855 -14856  14857 -840  14858 0
-14855 -14856  14857 -840 -14859 0
-14855 -14856  14857 -840  14860 0

c  -1+1 --> 0
c    ( b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0 ∧  p_840) -> (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧ -b^{28, 31}_0)
c  in CNF:
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_2
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_1
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_0
c  in DIMACS:
-14855  14856 -14857 -840 -14858 0
-14855  14856 -14857 -840 -14859 0
-14855  14856 -14857 -840 -14860 0

c  0+1 --> 1
c    (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧  p_840) -> (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0)
c  in CNF:
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_2
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_1
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨  b^{28, 31}_0
c  in DIMACS:
 14855  14856  14857 -840 -14858 0
 14855  14856  14857 -840 -14859 0
 14855  14856  14857 -840  14860 0

c  1+1 --> 2
c    (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0 ∧  p_840) -> (-b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0)
c  in CNF:
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_2
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨  b^{28, 31}_1
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ -p_840 ∨ -b^{28, 31}_0
c  in DIMACS:
 14855  14856 -14857 -840 -14858 0
 14855  14856 -14857 -840  14859 0
 14855  14856 -14857 -840 -14860 0

c  2+1 --> break 
c    (-b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧  p_840) -> break
c  in CNF:
c     b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 14855 -14856  14857 -840 1162 0


c  2-1 --> 1
c    (-b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧ -p_840) -> (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0)
c  in CNF:
c     b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_2
c     b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_1
c     b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨  b^{28, 31}_0
c  in DIMACS:
 14855 -14856  14857  840 -14858 0
 14855 -14856  14857  840 -14859 0
 14855 -14856  14857  840  14860 0

c  1-1 --> 0
c    (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0 ∧ -p_840) -> (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧ -b^{28, 31}_0)
c  in CNF:
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_2
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_1
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_0
c  in DIMACS:
 14855  14856 -14857  840 -14858 0
 14855  14856 -14857  840 -14859 0
 14855  14856 -14857  840 -14860 0

c  0-1 --> -1
c    (-b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧ -p_840) -> ( b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0)
c  in CNF:
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨  b^{28, 31}_2
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_1
c     b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨  b^{28, 31}_0
c  in DIMACS:
 14855  14856  14857  840  14858 0
 14855  14856  14857  840 -14859 0
 14855  14856  14857  840  14860 0

c  -1-1 --> -2
c    ( b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧  b^{28, 30}_0 ∧ -p_840) -> ( b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0)
c  in CNF:
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨  b^{28, 31}_2
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨  b^{28, 31}_1
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨  p_840 ∨ -b^{28, 31}_0
c  in DIMACS:
-14855  14856 -14857  840  14858 0
-14855  14856 -14857  840  14859 0
-14855  14856 -14857  840 -14860 0

c  -2-1 --> break 
c    ( b^{28, 30}_2 ∧  b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨  b^{28, 30}_0 ∨  p_840 ∨ break
c  in DIMACS:
-14855 -14856  14857  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 30}_2 ∧ -b^{28, 30}_1 ∧ -b^{28, 30}_0 ∧ true) 
c  in CNF:
c    -b^{28, 30}_2 ∨  b^{28, 30}_1 ∨  b^{28, 30}_0 ∨ false 
c  in DIMACS:
-14855  14856  14857  0

c  3 does not represent an automaton state.
c    -(-b^{28, 30}_2 ∧  b^{28, 30}_1 ∧  b^{28, 30}_0 ∧ true) 
c  in CNF:
c     b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ false 
c  in DIMACS:
 14855 -14856 -14857  0
c  -3 does not represent an automaton state.
c    -( b^{28, 30}_2 ∧  b^{28, 30}_1 ∧  b^{28, 30}_0 ∧ true) 
c  in CNF:
c    -b^{28, 30}_2 ∨ -b^{28, 30}_1 ∨ -b^{28, 30}_0 ∨ false 
c  in DIMACS:
-14855 -14856 -14857  0

c i = 31
c  -2+1 --> -1
c    ( b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧  p_868) -> ( b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0)
c  in CNF:
c    -b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨  b^{28, 32}_2
c    -b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_1
c    -b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨  b^{28, 32}_0
c  in DIMACS:
-14858 -14859  14860 -868  14861 0
-14858 -14859  14860 -868 -14862 0
-14858 -14859  14860 -868  14863 0

c  -1+1 --> 0
c    ( b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0 ∧  p_868) -> (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧ -b^{28, 32}_0)
c  in CNF:
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_2
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_1
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_0
c  in DIMACS:
-14858  14859 -14860 -868 -14861 0
-14858  14859 -14860 -868 -14862 0
-14858  14859 -14860 -868 -14863 0

c  0+1 --> 1
c    (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧  p_868) -> (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0)
c  in CNF:
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_2
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_1
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨  b^{28, 32}_0
c  in DIMACS:
 14858  14859  14860 -868 -14861 0
 14858  14859  14860 -868 -14862 0
 14858  14859  14860 -868  14863 0

c  1+1 --> 2
c    (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0 ∧  p_868) -> (-b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0)
c  in CNF:
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_2
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨  b^{28, 32}_1
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ -p_868 ∨ -b^{28, 32}_0
c  in DIMACS:
 14858  14859 -14860 -868 -14861 0
 14858  14859 -14860 -868  14862 0
 14858  14859 -14860 -868 -14863 0

c  2+1 --> break 
c    (-b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧  p_868) -> break
c  in CNF:
c     b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 14858 -14859  14860 -868 1162 0


c  2-1 --> 1
c    (-b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧ -p_868) -> (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0)
c  in CNF:
c     b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_2
c     b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_1
c     b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨  b^{28, 32}_0
c  in DIMACS:
 14858 -14859  14860  868 -14861 0
 14858 -14859  14860  868 -14862 0
 14858 -14859  14860  868  14863 0

c  1-1 --> 0
c    (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0 ∧ -p_868) -> (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧ -b^{28, 32}_0)
c  in CNF:
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_2
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_1
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_0
c  in DIMACS:
 14858  14859 -14860  868 -14861 0
 14858  14859 -14860  868 -14862 0
 14858  14859 -14860  868 -14863 0

c  0-1 --> -1
c    (-b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧ -p_868) -> ( b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0)
c  in CNF:
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨  b^{28, 32}_2
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_1
c     b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨  b^{28, 32}_0
c  in DIMACS:
 14858  14859  14860  868  14861 0
 14858  14859  14860  868 -14862 0
 14858  14859  14860  868  14863 0

c  -1-1 --> -2
c    ( b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧  b^{28, 31}_0 ∧ -p_868) -> ( b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0)
c  in CNF:
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨  b^{28, 32}_2
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨  b^{28, 32}_1
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨  p_868 ∨ -b^{28, 32}_0
c  in DIMACS:
-14858  14859 -14860  868  14861 0
-14858  14859 -14860  868  14862 0
-14858  14859 -14860  868 -14863 0

c  -2-1 --> break 
c    ( b^{28, 31}_2 ∧  b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨  b^{28, 31}_0 ∨  p_868 ∨ break
c  in DIMACS:
-14858 -14859  14860  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 31}_2 ∧ -b^{28, 31}_1 ∧ -b^{28, 31}_0 ∧ true) 
c  in CNF:
c    -b^{28, 31}_2 ∨  b^{28, 31}_1 ∨  b^{28, 31}_0 ∨ false 
c  in DIMACS:
-14858  14859  14860  0

c  3 does not represent an automaton state.
c    -(-b^{28, 31}_2 ∧  b^{28, 31}_1 ∧  b^{28, 31}_0 ∧ true) 
c  in CNF:
c     b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ false 
c  in DIMACS:
 14858 -14859 -14860  0
c  -3 does not represent an automaton state.
c    -( b^{28, 31}_2 ∧  b^{28, 31}_1 ∧  b^{28, 31}_0 ∧ true) 
c  in CNF:
c    -b^{28, 31}_2 ∨ -b^{28, 31}_1 ∨ -b^{28, 31}_0 ∨ false 
c  in DIMACS:
-14858 -14859 -14860  0

c i = 32
c  -2+1 --> -1
c    ( b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧  p_896) -> ( b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0)
c  in CNF:
c    -b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨  b^{28, 33}_2
c    -b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_1
c    -b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨  b^{28, 33}_0
c  in DIMACS:
-14861 -14862  14863 -896  14864 0
-14861 -14862  14863 -896 -14865 0
-14861 -14862  14863 -896  14866 0

c  -1+1 --> 0
c    ( b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0 ∧  p_896) -> (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧ -b^{28, 33}_0)
c  in CNF:
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_2
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_1
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_0
c  in DIMACS:
-14861  14862 -14863 -896 -14864 0
-14861  14862 -14863 -896 -14865 0
-14861  14862 -14863 -896 -14866 0

c  0+1 --> 1
c    (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧  p_896) -> (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0)
c  in CNF:
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_2
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_1
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨  b^{28, 33}_0
c  in DIMACS:
 14861  14862  14863 -896 -14864 0
 14861  14862  14863 -896 -14865 0
 14861  14862  14863 -896  14866 0

c  1+1 --> 2
c    (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0 ∧  p_896) -> (-b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0)
c  in CNF:
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_2
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨  b^{28, 33}_1
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ -p_896 ∨ -b^{28, 33}_0
c  in DIMACS:
 14861  14862 -14863 -896 -14864 0
 14861  14862 -14863 -896  14865 0
 14861  14862 -14863 -896 -14866 0

c  2+1 --> break 
c    (-b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧  p_896) -> break
c  in CNF:
c     b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 14861 -14862  14863 -896 1162 0


c  2-1 --> 1
c    (-b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧ -p_896) -> (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0)
c  in CNF:
c     b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_2
c     b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_1
c     b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨  b^{28, 33}_0
c  in DIMACS:
 14861 -14862  14863  896 -14864 0
 14861 -14862  14863  896 -14865 0
 14861 -14862  14863  896  14866 0

c  1-1 --> 0
c    (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0 ∧ -p_896) -> (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧ -b^{28, 33}_0)
c  in CNF:
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_2
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_1
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_0
c  in DIMACS:
 14861  14862 -14863  896 -14864 0
 14861  14862 -14863  896 -14865 0
 14861  14862 -14863  896 -14866 0

c  0-1 --> -1
c    (-b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧ -p_896) -> ( b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0)
c  in CNF:
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨  b^{28, 33}_2
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_1
c     b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨  b^{28, 33}_0
c  in DIMACS:
 14861  14862  14863  896  14864 0
 14861  14862  14863  896 -14865 0
 14861  14862  14863  896  14866 0

c  -1-1 --> -2
c    ( b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧  b^{28, 32}_0 ∧ -p_896) -> ( b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0)
c  in CNF:
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨  b^{28, 33}_2
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨  b^{28, 33}_1
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨  p_896 ∨ -b^{28, 33}_0
c  in DIMACS:
-14861  14862 -14863  896  14864 0
-14861  14862 -14863  896  14865 0
-14861  14862 -14863  896 -14866 0

c  -2-1 --> break 
c    ( b^{28, 32}_2 ∧  b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨  b^{28, 32}_0 ∨  p_896 ∨ break
c  in DIMACS:
-14861 -14862  14863  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 32}_2 ∧ -b^{28, 32}_1 ∧ -b^{28, 32}_0 ∧ true) 
c  in CNF:
c    -b^{28, 32}_2 ∨  b^{28, 32}_1 ∨  b^{28, 32}_0 ∨ false 
c  in DIMACS:
-14861  14862  14863  0

c  3 does not represent an automaton state.
c    -(-b^{28, 32}_2 ∧  b^{28, 32}_1 ∧  b^{28, 32}_0 ∧ true) 
c  in CNF:
c     b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ false 
c  in DIMACS:
 14861 -14862 -14863  0
c  -3 does not represent an automaton state.
c    -( b^{28, 32}_2 ∧  b^{28, 32}_1 ∧  b^{28, 32}_0 ∧ true) 
c  in CNF:
c    -b^{28, 32}_2 ∨ -b^{28, 32}_1 ∨ -b^{28, 32}_0 ∨ false 
c  in DIMACS:
-14861 -14862 -14863  0

c i = 33
c  -2+1 --> -1
c    ( b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧  p_924) -> ( b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0)
c  in CNF:
c    -b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨  b^{28, 34}_2
c    -b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_1
c    -b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨  b^{28, 34}_0
c  in DIMACS:
-14864 -14865  14866 -924  14867 0
-14864 -14865  14866 -924 -14868 0
-14864 -14865  14866 -924  14869 0

c  -1+1 --> 0
c    ( b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0 ∧  p_924) -> (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧ -b^{28, 34}_0)
c  in CNF:
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_2
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_1
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_0
c  in DIMACS:
-14864  14865 -14866 -924 -14867 0
-14864  14865 -14866 -924 -14868 0
-14864  14865 -14866 -924 -14869 0

c  0+1 --> 1
c    (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧  p_924) -> (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0)
c  in CNF:
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_2
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_1
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨  b^{28, 34}_0
c  in DIMACS:
 14864  14865  14866 -924 -14867 0
 14864  14865  14866 -924 -14868 0
 14864  14865  14866 -924  14869 0

c  1+1 --> 2
c    (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0 ∧  p_924) -> (-b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0)
c  in CNF:
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_2
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨  b^{28, 34}_1
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ -p_924 ∨ -b^{28, 34}_0
c  in DIMACS:
 14864  14865 -14866 -924 -14867 0
 14864  14865 -14866 -924  14868 0
 14864  14865 -14866 -924 -14869 0

c  2+1 --> break 
c    (-b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧  p_924) -> break
c  in CNF:
c     b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 14864 -14865  14866 -924 1162 0


c  2-1 --> 1
c    (-b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧ -p_924) -> (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0)
c  in CNF:
c     b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_2
c     b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_1
c     b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨  b^{28, 34}_0
c  in DIMACS:
 14864 -14865  14866  924 -14867 0
 14864 -14865  14866  924 -14868 0
 14864 -14865  14866  924  14869 0

c  1-1 --> 0
c    (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0 ∧ -p_924) -> (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧ -b^{28, 34}_0)
c  in CNF:
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_2
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_1
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_0
c  in DIMACS:
 14864  14865 -14866  924 -14867 0
 14864  14865 -14866  924 -14868 0
 14864  14865 -14866  924 -14869 0

c  0-1 --> -1
c    (-b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧ -p_924) -> ( b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0)
c  in CNF:
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨  b^{28, 34}_2
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_1
c     b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨  b^{28, 34}_0
c  in DIMACS:
 14864  14865  14866  924  14867 0
 14864  14865  14866  924 -14868 0
 14864  14865  14866  924  14869 0

c  -1-1 --> -2
c    ( b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧  b^{28, 33}_0 ∧ -p_924) -> ( b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0)
c  in CNF:
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨  b^{28, 34}_2
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨  b^{28, 34}_1
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨  p_924 ∨ -b^{28, 34}_0
c  in DIMACS:
-14864  14865 -14866  924  14867 0
-14864  14865 -14866  924  14868 0
-14864  14865 -14866  924 -14869 0

c  -2-1 --> break 
c    ( b^{28, 33}_2 ∧  b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨  b^{28, 33}_0 ∨  p_924 ∨ break
c  in DIMACS:
-14864 -14865  14866  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 33}_2 ∧ -b^{28, 33}_1 ∧ -b^{28, 33}_0 ∧ true) 
c  in CNF:
c    -b^{28, 33}_2 ∨  b^{28, 33}_1 ∨  b^{28, 33}_0 ∨ false 
c  in DIMACS:
-14864  14865  14866  0

c  3 does not represent an automaton state.
c    -(-b^{28, 33}_2 ∧  b^{28, 33}_1 ∧  b^{28, 33}_0 ∧ true) 
c  in CNF:
c     b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ false 
c  in DIMACS:
 14864 -14865 -14866  0
c  -3 does not represent an automaton state.
c    -( b^{28, 33}_2 ∧  b^{28, 33}_1 ∧  b^{28, 33}_0 ∧ true) 
c  in CNF:
c    -b^{28, 33}_2 ∨ -b^{28, 33}_1 ∨ -b^{28, 33}_0 ∨ false 
c  in DIMACS:
-14864 -14865 -14866  0

c i = 34
c  -2+1 --> -1
c    ( b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧  p_952) -> ( b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0)
c  in CNF:
c    -b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨  b^{28, 35}_2
c    -b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_1
c    -b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨  b^{28, 35}_0
c  in DIMACS:
-14867 -14868  14869 -952  14870 0
-14867 -14868  14869 -952 -14871 0
-14867 -14868  14869 -952  14872 0

c  -1+1 --> 0
c    ( b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0 ∧  p_952) -> (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧ -b^{28, 35}_0)
c  in CNF:
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_2
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_1
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_0
c  in DIMACS:
-14867  14868 -14869 -952 -14870 0
-14867  14868 -14869 -952 -14871 0
-14867  14868 -14869 -952 -14872 0

c  0+1 --> 1
c    (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧  p_952) -> (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0)
c  in CNF:
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_2
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_1
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨  b^{28, 35}_0
c  in DIMACS:
 14867  14868  14869 -952 -14870 0
 14867  14868  14869 -952 -14871 0
 14867  14868  14869 -952  14872 0

c  1+1 --> 2
c    (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0 ∧  p_952) -> (-b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0)
c  in CNF:
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_2
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨  b^{28, 35}_1
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ -p_952 ∨ -b^{28, 35}_0
c  in DIMACS:
 14867  14868 -14869 -952 -14870 0
 14867  14868 -14869 -952  14871 0
 14867  14868 -14869 -952 -14872 0

c  2+1 --> break 
c    (-b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧  p_952) -> break
c  in CNF:
c     b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 14867 -14868  14869 -952 1162 0


c  2-1 --> 1
c    (-b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧ -p_952) -> (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0)
c  in CNF:
c     b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_2
c     b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_1
c     b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨  b^{28, 35}_0
c  in DIMACS:
 14867 -14868  14869  952 -14870 0
 14867 -14868  14869  952 -14871 0
 14867 -14868  14869  952  14872 0

c  1-1 --> 0
c    (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0 ∧ -p_952) -> (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧ -b^{28, 35}_0)
c  in CNF:
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_2
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_1
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_0
c  in DIMACS:
 14867  14868 -14869  952 -14870 0
 14867  14868 -14869  952 -14871 0
 14867  14868 -14869  952 -14872 0

c  0-1 --> -1
c    (-b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧ -p_952) -> ( b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0)
c  in CNF:
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨  b^{28, 35}_2
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_1
c     b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨  b^{28, 35}_0
c  in DIMACS:
 14867  14868  14869  952  14870 0
 14867  14868  14869  952 -14871 0
 14867  14868  14869  952  14872 0

c  -1-1 --> -2
c    ( b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧  b^{28, 34}_0 ∧ -p_952) -> ( b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0)
c  in CNF:
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨  b^{28, 35}_2
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨  b^{28, 35}_1
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨  p_952 ∨ -b^{28, 35}_0
c  in DIMACS:
-14867  14868 -14869  952  14870 0
-14867  14868 -14869  952  14871 0
-14867  14868 -14869  952 -14872 0

c  -2-1 --> break 
c    ( b^{28, 34}_2 ∧  b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨  b^{28, 34}_0 ∨  p_952 ∨ break
c  in DIMACS:
-14867 -14868  14869  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 34}_2 ∧ -b^{28, 34}_1 ∧ -b^{28, 34}_0 ∧ true) 
c  in CNF:
c    -b^{28, 34}_2 ∨  b^{28, 34}_1 ∨  b^{28, 34}_0 ∨ false 
c  in DIMACS:
-14867  14868  14869  0

c  3 does not represent an automaton state.
c    -(-b^{28, 34}_2 ∧  b^{28, 34}_1 ∧  b^{28, 34}_0 ∧ true) 
c  in CNF:
c     b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ false 
c  in DIMACS:
 14867 -14868 -14869  0
c  -3 does not represent an automaton state.
c    -( b^{28, 34}_2 ∧  b^{28, 34}_1 ∧  b^{28, 34}_0 ∧ true) 
c  in CNF:
c    -b^{28, 34}_2 ∨ -b^{28, 34}_1 ∨ -b^{28, 34}_0 ∨ false 
c  in DIMACS:
-14867 -14868 -14869  0

c i = 35
c  -2+1 --> -1
c    ( b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧  p_980) -> ( b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0)
c  in CNF:
c    -b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨  b^{28, 36}_2
c    -b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_1
c    -b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨  b^{28, 36}_0
c  in DIMACS:
-14870 -14871  14872 -980  14873 0
-14870 -14871  14872 -980 -14874 0
-14870 -14871  14872 -980  14875 0

c  -1+1 --> 0
c    ( b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0 ∧  p_980) -> (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧ -b^{28, 36}_0)
c  in CNF:
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_2
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_1
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_0
c  in DIMACS:
-14870  14871 -14872 -980 -14873 0
-14870  14871 -14872 -980 -14874 0
-14870  14871 -14872 -980 -14875 0

c  0+1 --> 1
c    (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧  p_980) -> (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0)
c  in CNF:
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_2
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_1
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨  b^{28, 36}_0
c  in DIMACS:
 14870  14871  14872 -980 -14873 0
 14870  14871  14872 -980 -14874 0
 14870  14871  14872 -980  14875 0

c  1+1 --> 2
c    (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0 ∧  p_980) -> (-b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0)
c  in CNF:
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_2
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨  b^{28, 36}_1
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ -p_980 ∨ -b^{28, 36}_0
c  in DIMACS:
 14870  14871 -14872 -980 -14873 0
 14870  14871 -14872 -980  14874 0
 14870  14871 -14872 -980 -14875 0

c  2+1 --> break 
c    (-b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧  p_980) -> break
c  in CNF:
c     b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 14870 -14871  14872 -980 1162 0


c  2-1 --> 1
c    (-b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧ -p_980) -> (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0)
c  in CNF:
c     b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_2
c     b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_1
c     b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨  b^{28, 36}_0
c  in DIMACS:
 14870 -14871  14872  980 -14873 0
 14870 -14871  14872  980 -14874 0
 14870 -14871  14872  980  14875 0

c  1-1 --> 0
c    (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0 ∧ -p_980) -> (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧ -b^{28, 36}_0)
c  in CNF:
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_2
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_1
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_0
c  in DIMACS:
 14870  14871 -14872  980 -14873 0
 14870  14871 -14872  980 -14874 0
 14870  14871 -14872  980 -14875 0

c  0-1 --> -1
c    (-b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧ -p_980) -> ( b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0)
c  in CNF:
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨  b^{28, 36}_2
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_1
c     b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨  b^{28, 36}_0
c  in DIMACS:
 14870  14871  14872  980  14873 0
 14870  14871  14872  980 -14874 0
 14870  14871  14872  980  14875 0

c  -1-1 --> -2
c    ( b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧  b^{28, 35}_0 ∧ -p_980) -> ( b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0)
c  in CNF:
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨  b^{28, 36}_2
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨  b^{28, 36}_1
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨  p_980 ∨ -b^{28, 36}_0
c  in DIMACS:
-14870  14871 -14872  980  14873 0
-14870  14871 -14872  980  14874 0
-14870  14871 -14872  980 -14875 0

c  -2-1 --> break 
c    ( b^{28, 35}_2 ∧  b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨  b^{28, 35}_0 ∨  p_980 ∨ break
c  in DIMACS:
-14870 -14871  14872  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 35}_2 ∧ -b^{28, 35}_1 ∧ -b^{28, 35}_0 ∧ true) 
c  in CNF:
c    -b^{28, 35}_2 ∨  b^{28, 35}_1 ∨  b^{28, 35}_0 ∨ false 
c  in DIMACS:
-14870  14871  14872  0

c  3 does not represent an automaton state.
c    -(-b^{28, 35}_2 ∧  b^{28, 35}_1 ∧  b^{28, 35}_0 ∧ true) 
c  in CNF:
c     b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ false 
c  in DIMACS:
 14870 -14871 -14872  0
c  -3 does not represent an automaton state.
c    -( b^{28, 35}_2 ∧  b^{28, 35}_1 ∧  b^{28, 35}_0 ∧ true) 
c  in CNF:
c    -b^{28, 35}_2 ∨ -b^{28, 35}_1 ∨ -b^{28, 35}_0 ∨ false 
c  in DIMACS:
-14870 -14871 -14872  0

c i = 36
c  -2+1 --> -1
c    ( b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧  p_1008) -> ( b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0)
c  in CNF:
c    -b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨  b^{28, 37}_2
c    -b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_1
c    -b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨  b^{28, 37}_0
c  in DIMACS:
-14873 -14874  14875 -1008  14876 0
-14873 -14874  14875 -1008 -14877 0
-14873 -14874  14875 -1008  14878 0

c  -1+1 --> 0
c    ( b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0 ∧  p_1008) -> (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧ -b^{28, 37}_0)
c  in CNF:
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_2
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_1
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_0
c  in DIMACS:
-14873  14874 -14875 -1008 -14876 0
-14873  14874 -14875 -1008 -14877 0
-14873  14874 -14875 -1008 -14878 0

c  0+1 --> 1
c    (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧  p_1008) -> (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0)
c  in CNF:
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_2
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_1
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨  b^{28, 37}_0
c  in DIMACS:
 14873  14874  14875 -1008 -14876 0
 14873  14874  14875 -1008 -14877 0
 14873  14874  14875 -1008  14878 0

c  1+1 --> 2
c    (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0 ∧  p_1008) -> (-b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0)
c  in CNF:
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_2
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨  b^{28, 37}_1
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ -p_1008 ∨ -b^{28, 37}_0
c  in DIMACS:
 14873  14874 -14875 -1008 -14876 0
 14873  14874 -14875 -1008  14877 0
 14873  14874 -14875 -1008 -14878 0

c  2+1 --> break 
c    (-b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 14873 -14874  14875 -1008 1162 0


c  2-1 --> 1
c    (-b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧ -p_1008) -> (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0)
c  in CNF:
c     b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_2
c     b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_1
c     b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨  b^{28, 37}_0
c  in DIMACS:
 14873 -14874  14875  1008 -14876 0
 14873 -14874  14875  1008 -14877 0
 14873 -14874  14875  1008  14878 0

c  1-1 --> 0
c    (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0 ∧ -p_1008) -> (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧ -b^{28, 37}_0)
c  in CNF:
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_2
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_1
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_0
c  in DIMACS:
 14873  14874 -14875  1008 -14876 0
 14873  14874 -14875  1008 -14877 0
 14873  14874 -14875  1008 -14878 0

c  0-1 --> -1
c    (-b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧ -p_1008) -> ( b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0)
c  in CNF:
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨  b^{28, 37}_2
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_1
c     b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨  b^{28, 37}_0
c  in DIMACS:
 14873  14874  14875  1008  14876 0
 14873  14874  14875  1008 -14877 0
 14873  14874  14875  1008  14878 0

c  -1-1 --> -2
c    ( b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧  b^{28, 36}_0 ∧ -p_1008) -> ( b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0)
c  in CNF:
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨  b^{28, 37}_2
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨  b^{28, 37}_1
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨  p_1008 ∨ -b^{28, 37}_0
c  in DIMACS:
-14873  14874 -14875  1008  14876 0
-14873  14874 -14875  1008  14877 0
-14873  14874 -14875  1008 -14878 0

c  -2-1 --> break 
c    ( b^{28, 36}_2 ∧  b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨  b^{28, 36}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-14873 -14874  14875  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 36}_2 ∧ -b^{28, 36}_1 ∧ -b^{28, 36}_0 ∧ true) 
c  in CNF:
c    -b^{28, 36}_2 ∨  b^{28, 36}_1 ∨  b^{28, 36}_0 ∨ false 
c  in DIMACS:
-14873  14874  14875  0

c  3 does not represent an automaton state.
c    -(-b^{28, 36}_2 ∧  b^{28, 36}_1 ∧  b^{28, 36}_0 ∧ true) 
c  in CNF:
c     b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ false 
c  in DIMACS:
 14873 -14874 -14875  0
c  -3 does not represent an automaton state.
c    -( b^{28, 36}_2 ∧  b^{28, 36}_1 ∧  b^{28, 36}_0 ∧ true) 
c  in CNF:
c    -b^{28, 36}_2 ∨ -b^{28, 36}_1 ∨ -b^{28, 36}_0 ∨ false 
c  in DIMACS:
-14873 -14874 -14875  0

c i = 37
c  -2+1 --> -1
c    ( b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧  p_1036) -> ( b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0)
c  in CNF:
c    -b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨  b^{28, 38}_2
c    -b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_1
c    -b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨  b^{28, 38}_0
c  in DIMACS:
-14876 -14877  14878 -1036  14879 0
-14876 -14877  14878 -1036 -14880 0
-14876 -14877  14878 -1036  14881 0

c  -1+1 --> 0
c    ( b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0 ∧  p_1036) -> (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧ -b^{28, 38}_0)
c  in CNF:
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_2
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_1
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_0
c  in DIMACS:
-14876  14877 -14878 -1036 -14879 0
-14876  14877 -14878 -1036 -14880 0
-14876  14877 -14878 -1036 -14881 0

c  0+1 --> 1
c    (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧  p_1036) -> (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0)
c  in CNF:
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_2
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_1
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨  b^{28, 38}_0
c  in DIMACS:
 14876  14877  14878 -1036 -14879 0
 14876  14877  14878 -1036 -14880 0
 14876  14877  14878 -1036  14881 0

c  1+1 --> 2
c    (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0 ∧  p_1036) -> (-b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0)
c  in CNF:
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_2
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨  b^{28, 38}_1
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ -p_1036 ∨ -b^{28, 38}_0
c  in DIMACS:
 14876  14877 -14878 -1036 -14879 0
 14876  14877 -14878 -1036  14880 0
 14876  14877 -14878 -1036 -14881 0

c  2+1 --> break 
c    (-b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 14876 -14877  14878 -1036 1162 0


c  2-1 --> 1
c    (-b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧ -p_1036) -> (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0)
c  in CNF:
c     b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_2
c     b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_1
c     b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨  b^{28, 38}_0
c  in DIMACS:
 14876 -14877  14878  1036 -14879 0
 14876 -14877  14878  1036 -14880 0
 14876 -14877  14878  1036  14881 0

c  1-1 --> 0
c    (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0 ∧ -p_1036) -> (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧ -b^{28, 38}_0)
c  in CNF:
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_2
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_1
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_0
c  in DIMACS:
 14876  14877 -14878  1036 -14879 0
 14876  14877 -14878  1036 -14880 0
 14876  14877 -14878  1036 -14881 0

c  0-1 --> -1
c    (-b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧ -p_1036) -> ( b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0)
c  in CNF:
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨  b^{28, 38}_2
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_1
c     b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨  b^{28, 38}_0
c  in DIMACS:
 14876  14877  14878  1036  14879 0
 14876  14877  14878  1036 -14880 0
 14876  14877  14878  1036  14881 0

c  -1-1 --> -2
c    ( b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧  b^{28, 37}_0 ∧ -p_1036) -> ( b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0)
c  in CNF:
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨  b^{28, 38}_2
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨  b^{28, 38}_1
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨  p_1036 ∨ -b^{28, 38}_0
c  in DIMACS:
-14876  14877 -14878  1036  14879 0
-14876  14877 -14878  1036  14880 0
-14876  14877 -14878  1036 -14881 0

c  -2-1 --> break 
c    ( b^{28, 37}_2 ∧  b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨  b^{28, 37}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-14876 -14877  14878  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 37}_2 ∧ -b^{28, 37}_1 ∧ -b^{28, 37}_0 ∧ true) 
c  in CNF:
c    -b^{28, 37}_2 ∨  b^{28, 37}_1 ∨  b^{28, 37}_0 ∨ false 
c  in DIMACS:
-14876  14877  14878  0

c  3 does not represent an automaton state.
c    -(-b^{28, 37}_2 ∧  b^{28, 37}_1 ∧  b^{28, 37}_0 ∧ true) 
c  in CNF:
c     b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ false 
c  in DIMACS:
 14876 -14877 -14878  0
c  -3 does not represent an automaton state.
c    -( b^{28, 37}_2 ∧  b^{28, 37}_1 ∧  b^{28, 37}_0 ∧ true) 
c  in CNF:
c    -b^{28, 37}_2 ∨ -b^{28, 37}_1 ∨ -b^{28, 37}_0 ∨ false 
c  in DIMACS:
-14876 -14877 -14878  0

c i = 38
c  -2+1 --> -1
c    ( b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧  p_1064) -> ( b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0)
c  in CNF:
c    -b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨  b^{28, 39}_2
c    -b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_1
c    -b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨  b^{28, 39}_0
c  in DIMACS:
-14879 -14880  14881 -1064  14882 0
-14879 -14880  14881 -1064 -14883 0
-14879 -14880  14881 -1064  14884 0

c  -1+1 --> 0
c    ( b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0 ∧  p_1064) -> (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧ -b^{28, 39}_0)
c  in CNF:
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_2
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_1
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_0
c  in DIMACS:
-14879  14880 -14881 -1064 -14882 0
-14879  14880 -14881 -1064 -14883 0
-14879  14880 -14881 -1064 -14884 0

c  0+1 --> 1
c    (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧  p_1064) -> (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0)
c  in CNF:
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_2
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_1
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨  b^{28, 39}_0
c  in DIMACS:
 14879  14880  14881 -1064 -14882 0
 14879  14880  14881 -1064 -14883 0
 14879  14880  14881 -1064  14884 0

c  1+1 --> 2
c    (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0 ∧  p_1064) -> (-b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0)
c  in CNF:
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_2
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨  b^{28, 39}_1
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ -p_1064 ∨ -b^{28, 39}_0
c  in DIMACS:
 14879  14880 -14881 -1064 -14882 0
 14879  14880 -14881 -1064  14883 0
 14879  14880 -14881 -1064 -14884 0

c  2+1 --> break 
c    (-b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 14879 -14880  14881 -1064 1162 0


c  2-1 --> 1
c    (-b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧ -p_1064) -> (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0)
c  in CNF:
c     b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_2
c     b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_1
c     b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨  b^{28, 39}_0
c  in DIMACS:
 14879 -14880  14881  1064 -14882 0
 14879 -14880  14881  1064 -14883 0
 14879 -14880  14881  1064  14884 0

c  1-1 --> 0
c    (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0 ∧ -p_1064) -> (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧ -b^{28, 39}_0)
c  in CNF:
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_2
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_1
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_0
c  in DIMACS:
 14879  14880 -14881  1064 -14882 0
 14879  14880 -14881  1064 -14883 0
 14879  14880 -14881  1064 -14884 0

c  0-1 --> -1
c    (-b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧ -p_1064) -> ( b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0)
c  in CNF:
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨  b^{28, 39}_2
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_1
c     b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨  b^{28, 39}_0
c  in DIMACS:
 14879  14880  14881  1064  14882 0
 14879  14880  14881  1064 -14883 0
 14879  14880  14881  1064  14884 0

c  -1-1 --> -2
c    ( b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧  b^{28, 38}_0 ∧ -p_1064) -> ( b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0)
c  in CNF:
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨  b^{28, 39}_2
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨  b^{28, 39}_1
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨  p_1064 ∨ -b^{28, 39}_0
c  in DIMACS:
-14879  14880 -14881  1064  14882 0
-14879  14880 -14881  1064  14883 0
-14879  14880 -14881  1064 -14884 0

c  -2-1 --> break 
c    ( b^{28, 38}_2 ∧  b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨  b^{28, 38}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-14879 -14880  14881  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 38}_2 ∧ -b^{28, 38}_1 ∧ -b^{28, 38}_0 ∧ true) 
c  in CNF:
c    -b^{28, 38}_2 ∨  b^{28, 38}_1 ∨  b^{28, 38}_0 ∨ false 
c  in DIMACS:
-14879  14880  14881  0

c  3 does not represent an automaton state.
c    -(-b^{28, 38}_2 ∧  b^{28, 38}_1 ∧  b^{28, 38}_0 ∧ true) 
c  in CNF:
c     b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ false 
c  in DIMACS:
 14879 -14880 -14881  0
c  -3 does not represent an automaton state.
c    -( b^{28, 38}_2 ∧  b^{28, 38}_1 ∧  b^{28, 38}_0 ∧ true) 
c  in CNF:
c    -b^{28, 38}_2 ∨ -b^{28, 38}_1 ∨ -b^{28, 38}_0 ∨ false 
c  in DIMACS:
-14879 -14880 -14881  0

c i = 39
c  -2+1 --> -1
c    ( b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧  p_1092) -> ( b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0)
c  in CNF:
c    -b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨  b^{28, 40}_2
c    -b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_1
c    -b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨  b^{28, 40}_0
c  in DIMACS:
-14882 -14883  14884 -1092  14885 0
-14882 -14883  14884 -1092 -14886 0
-14882 -14883  14884 -1092  14887 0

c  -1+1 --> 0
c    ( b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0 ∧  p_1092) -> (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧ -b^{28, 40}_0)
c  in CNF:
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_2
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_1
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_0
c  in DIMACS:
-14882  14883 -14884 -1092 -14885 0
-14882  14883 -14884 -1092 -14886 0
-14882  14883 -14884 -1092 -14887 0

c  0+1 --> 1
c    (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧  p_1092) -> (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0)
c  in CNF:
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_2
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_1
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨  b^{28, 40}_0
c  in DIMACS:
 14882  14883  14884 -1092 -14885 0
 14882  14883  14884 -1092 -14886 0
 14882  14883  14884 -1092  14887 0

c  1+1 --> 2
c    (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0 ∧  p_1092) -> (-b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0)
c  in CNF:
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_2
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨  b^{28, 40}_1
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ -p_1092 ∨ -b^{28, 40}_0
c  in DIMACS:
 14882  14883 -14884 -1092 -14885 0
 14882  14883 -14884 -1092  14886 0
 14882  14883 -14884 -1092 -14887 0

c  2+1 --> break 
c    (-b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 14882 -14883  14884 -1092 1162 0


c  2-1 --> 1
c    (-b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧ -p_1092) -> (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0)
c  in CNF:
c     b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_2
c     b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_1
c     b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨  b^{28, 40}_0
c  in DIMACS:
 14882 -14883  14884  1092 -14885 0
 14882 -14883  14884  1092 -14886 0
 14882 -14883  14884  1092  14887 0

c  1-1 --> 0
c    (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0 ∧ -p_1092) -> (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧ -b^{28, 40}_0)
c  in CNF:
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_2
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_1
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_0
c  in DIMACS:
 14882  14883 -14884  1092 -14885 0
 14882  14883 -14884  1092 -14886 0
 14882  14883 -14884  1092 -14887 0

c  0-1 --> -1
c    (-b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧ -p_1092) -> ( b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0)
c  in CNF:
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨  b^{28, 40}_2
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_1
c     b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨  b^{28, 40}_0
c  in DIMACS:
 14882  14883  14884  1092  14885 0
 14882  14883  14884  1092 -14886 0
 14882  14883  14884  1092  14887 0

c  -1-1 --> -2
c    ( b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧  b^{28, 39}_0 ∧ -p_1092) -> ( b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0)
c  in CNF:
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨  b^{28, 40}_2
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨  b^{28, 40}_1
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨  p_1092 ∨ -b^{28, 40}_0
c  in DIMACS:
-14882  14883 -14884  1092  14885 0
-14882  14883 -14884  1092  14886 0
-14882  14883 -14884  1092 -14887 0

c  -2-1 --> break 
c    ( b^{28, 39}_2 ∧  b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨  b^{28, 39}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-14882 -14883  14884  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 39}_2 ∧ -b^{28, 39}_1 ∧ -b^{28, 39}_0 ∧ true) 
c  in CNF:
c    -b^{28, 39}_2 ∨  b^{28, 39}_1 ∨  b^{28, 39}_0 ∨ false 
c  in DIMACS:
-14882  14883  14884  0

c  3 does not represent an automaton state.
c    -(-b^{28, 39}_2 ∧  b^{28, 39}_1 ∧  b^{28, 39}_0 ∧ true) 
c  in CNF:
c     b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ false 
c  in DIMACS:
 14882 -14883 -14884  0
c  -3 does not represent an automaton state.
c    -( b^{28, 39}_2 ∧  b^{28, 39}_1 ∧  b^{28, 39}_0 ∧ true) 
c  in CNF:
c    -b^{28, 39}_2 ∨ -b^{28, 39}_1 ∨ -b^{28, 39}_0 ∨ false 
c  in DIMACS:
-14882 -14883 -14884  0

c i = 40
c  -2+1 --> -1
c    ( b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧  p_1120) -> ( b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0)
c  in CNF:
c    -b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨  b^{28, 41}_2
c    -b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_1
c    -b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨  b^{28, 41}_0
c  in DIMACS:
-14885 -14886  14887 -1120  14888 0
-14885 -14886  14887 -1120 -14889 0
-14885 -14886  14887 -1120  14890 0

c  -1+1 --> 0
c    ( b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0 ∧  p_1120) -> (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧ -b^{28, 41}_0)
c  in CNF:
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_2
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_1
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_0
c  in DIMACS:
-14885  14886 -14887 -1120 -14888 0
-14885  14886 -14887 -1120 -14889 0
-14885  14886 -14887 -1120 -14890 0

c  0+1 --> 1
c    (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧  p_1120) -> (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0)
c  in CNF:
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_2
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_1
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨  b^{28, 41}_0
c  in DIMACS:
 14885  14886  14887 -1120 -14888 0
 14885  14886  14887 -1120 -14889 0
 14885  14886  14887 -1120  14890 0

c  1+1 --> 2
c    (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0 ∧  p_1120) -> (-b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0)
c  in CNF:
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_2
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨  b^{28, 41}_1
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ -p_1120 ∨ -b^{28, 41}_0
c  in DIMACS:
 14885  14886 -14887 -1120 -14888 0
 14885  14886 -14887 -1120  14889 0
 14885  14886 -14887 -1120 -14890 0

c  2+1 --> break 
c    (-b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 14885 -14886  14887 -1120 1162 0


c  2-1 --> 1
c    (-b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧ -p_1120) -> (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0)
c  in CNF:
c     b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_2
c     b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_1
c     b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨  b^{28, 41}_0
c  in DIMACS:
 14885 -14886  14887  1120 -14888 0
 14885 -14886  14887  1120 -14889 0
 14885 -14886  14887  1120  14890 0

c  1-1 --> 0
c    (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0 ∧ -p_1120) -> (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧ -b^{28, 41}_0)
c  in CNF:
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_2
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_1
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_0
c  in DIMACS:
 14885  14886 -14887  1120 -14888 0
 14885  14886 -14887  1120 -14889 0
 14885  14886 -14887  1120 -14890 0

c  0-1 --> -1
c    (-b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧ -p_1120) -> ( b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0)
c  in CNF:
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨  b^{28, 41}_2
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_1
c     b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨  b^{28, 41}_0
c  in DIMACS:
 14885  14886  14887  1120  14888 0
 14885  14886  14887  1120 -14889 0
 14885  14886  14887  1120  14890 0

c  -1-1 --> -2
c    ( b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧  b^{28, 40}_0 ∧ -p_1120) -> ( b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0)
c  in CNF:
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨  b^{28, 41}_2
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨  b^{28, 41}_1
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨  p_1120 ∨ -b^{28, 41}_0
c  in DIMACS:
-14885  14886 -14887  1120  14888 0
-14885  14886 -14887  1120  14889 0
-14885  14886 -14887  1120 -14890 0

c  -2-1 --> break 
c    ( b^{28, 40}_2 ∧  b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨  b^{28, 40}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-14885 -14886  14887  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 40}_2 ∧ -b^{28, 40}_1 ∧ -b^{28, 40}_0 ∧ true) 
c  in CNF:
c    -b^{28, 40}_2 ∨  b^{28, 40}_1 ∨  b^{28, 40}_0 ∨ false 
c  in DIMACS:
-14885  14886  14887  0

c  3 does not represent an automaton state.
c    -(-b^{28, 40}_2 ∧  b^{28, 40}_1 ∧  b^{28, 40}_0 ∧ true) 
c  in CNF:
c     b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ false 
c  in DIMACS:
 14885 -14886 -14887  0
c  -3 does not represent an automaton state.
c    -( b^{28, 40}_2 ∧  b^{28, 40}_1 ∧  b^{28, 40}_0 ∧ true) 
c  in CNF:
c    -b^{28, 40}_2 ∨ -b^{28, 40}_1 ∨ -b^{28, 40}_0 ∨ false 
c  in DIMACS:
-14885 -14886 -14887  0

c i = 41
c  -2+1 --> -1
c    ( b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧  p_1148) -> ( b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧  b^{28, 42}_0)
c  in CNF:
c    -b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨  b^{28, 42}_2
c    -b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_1
c    -b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨  b^{28, 42}_0
c  in DIMACS:
-14888 -14889  14890 -1148  14891 0
-14888 -14889  14890 -1148 -14892 0
-14888 -14889  14890 -1148  14893 0

c  -1+1 --> 0
c    ( b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0 ∧  p_1148) -> (-b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧ -b^{28, 42}_0)
c  in CNF:
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_2
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_1
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_0
c  in DIMACS:
-14888  14889 -14890 -1148 -14891 0
-14888  14889 -14890 -1148 -14892 0
-14888  14889 -14890 -1148 -14893 0

c  0+1 --> 1
c    (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧  p_1148) -> (-b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧  b^{28, 42}_0)
c  in CNF:
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_2
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_1
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨  b^{28, 42}_0
c  in DIMACS:
 14888  14889  14890 -1148 -14891 0
 14888  14889  14890 -1148 -14892 0
 14888  14889  14890 -1148  14893 0

c  1+1 --> 2
c    (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0 ∧  p_1148) -> (-b^{28, 42}_2 ∧  b^{28, 42}_1 ∧ -b^{28, 42}_0)
c  in CNF:
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_2
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨  b^{28, 42}_1
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ -p_1148 ∨ -b^{28, 42}_0
c  in DIMACS:
 14888  14889 -14890 -1148 -14891 0
 14888  14889 -14890 -1148  14892 0
 14888  14889 -14890 -1148 -14893 0

c  2+1 --> break 
c    (-b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 14888 -14889  14890 -1148 1162 0


c  2-1 --> 1
c    (-b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧ -p_1148) -> (-b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧  b^{28, 42}_0)
c  in CNF:
c     b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_2
c     b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_1
c     b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨  b^{28, 42}_0
c  in DIMACS:
 14888 -14889  14890  1148 -14891 0
 14888 -14889  14890  1148 -14892 0
 14888 -14889  14890  1148  14893 0

c  1-1 --> 0
c    (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0 ∧ -p_1148) -> (-b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧ -b^{28, 42}_0)
c  in CNF:
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_2
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_1
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_0
c  in DIMACS:
 14888  14889 -14890  1148 -14891 0
 14888  14889 -14890  1148 -14892 0
 14888  14889 -14890  1148 -14893 0

c  0-1 --> -1
c    (-b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧ -p_1148) -> ( b^{28, 42}_2 ∧ -b^{28, 42}_1 ∧  b^{28, 42}_0)
c  in CNF:
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨  b^{28, 42}_2
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_1
c     b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨  b^{28, 42}_0
c  in DIMACS:
 14888  14889  14890  1148  14891 0
 14888  14889  14890  1148 -14892 0
 14888  14889  14890  1148  14893 0

c  -1-1 --> -2
c    ( b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧  b^{28, 41}_0 ∧ -p_1148) -> ( b^{28, 42}_2 ∧  b^{28, 42}_1 ∧ -b^{28, 42}_0)
c  in CNF:
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨  b^{28, 42}_2
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨  b^{28, 42}_1
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨  p_1148 ∨ -b^{28, 42}_0
c  in DIMACS:
-14888  14889 -14890  1148  14891 0
-14888  14889 -14890  1148  14892 0
-14888  14889 -14890  1148 -14893 0

c  -2-1 --> break 
c    ( b^{28, 41}_2 ∧  b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨  b^{28, 41}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-14888 -14889  14890  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{28, 41}_2 ∧ -b^{28, 41}_1 ∧ -b^{28, 41}_0 ∧ true) 
c  in CNF:
c    -b^{28, 41}_2 ∨  b^{28, 41}_1 ∨  b^{28, 41}_0 ∨ false 
c  in DIMACS:
-14888  14889  14890  0

c  3 does not represent an automaton state.
c    -(-b^{28, 41}_2 ∧  b^{28, 41}_1 ∧  b^{28, 41}_0 ∧ true) 
c  in CNF:
c     b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ false 
c  in DIMACS:
 14888 -14889 -14890  0
c  -3 does not represent an automaton state.
c    -( b^{28, 41}_2 ∧  b^{28, 41}_1 ∧  b^{28, 41}_0 ∧ true) 
c  in CNF:
c    -b^{28, 41}_2 ∨ -b^{28, 41}_1 ∨ -b^{28, 41}_0 ∨ false 
c  in DIMACS:
-14888 -14889 -14890  0

c INIT for k = 29
c    -b^{29, 1}_2
c    -b^{29, 1}_1
c    -b^{29, 1}_0
c  in DIMACS:
-14894 0
-14895 0
-14896 0

c Transitions for k = 29
c i = 1
c  -2+1 --> -1
c    ( b^{29, 1}_2 ∧  b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧  p_29) -> ( b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0)
c  in CNF:
c    -b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨  b^{29, 2}_2
c    -b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_1
c    -b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨  b^{29, 2}_0
c  in DIMACS:
-14894 -14895  14896 -29  14897 0
-14894 -14895  14896 -29 -14898 0
-14894 -14895  14896 -29  14899 0

c  -1+1 --> 0
c    ( b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧  b^{29, 1}_0 ∧  p_29) -> (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧ -b^{29, 2}_0)
c  in CNF:
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_2
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_1
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_0
c  in DIMACS:
-14894  14895 -14896 -29 -14897 0
-14894  14895 -14896 -29 -14898 0
-14894  14895 -14896 -29 -14899 0

c  0+1 --> 1
c    (-b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧  p_29) -> (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0)
c  in CNF:
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_2
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_1
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨  b^{29, 2}_0
c  in DIMACS:
 14894  14895  14896 -29 -14897 0
 14894  14895  14896 -29 -14898 0
 14894  14895  14896 -29  14899 0

c  1+1 --> 2
c    (-b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧  b^{29, 1}_0 ∧  p_29) -> (-b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0)
c  in CNF:
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_2
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨  b^{29, 2}_1
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ -p_29 ∨ -b^{29, 2}_0
c  in DIMACS:
 14894  14895 -14896 -29 -14897 0
 14894  14895 -14896 -29  14898 0
 14894  14895 -14896 -29 -14899 0

c  2+1 --> break 
c    (-b^{29, 1}_2 ∧  b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧  p_29) -> break
c  in CNF:
c     b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ -p_29 ∨ break
c  in DIMACS:
 14894 -14895  14896 -29 1162 0


c  2-1 --> 1
c    (-b^{29, 1}_2 ∧  b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧ -p_29) -> (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0)
c  in CNF:
c     b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_2
c     b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_1
c     b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨  b^{29, 2}_0
c  in DIMACS:
 14894 -14895  14896  29 -14897 0
 14894 -14895  14896  29 -14898 0
 14894 -14895  14896  29  14899 0

c  1-1 --> 0
c    (-b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧  b^{29, 1}_0 ∧ -p_29) -> (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧ -b^{29, 2}_0)
c  in CNF:
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_2
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_1
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_0
c  in DIMACS:
 14894  14895 -14896  29 -14897 0
 14894  14895 -14896  29 -14898 0
 14894  14895 -14896  29 -14899 0

c  0-1 --> -1
c    (-b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧ -p_29) -> ( b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0)
c  in CNF:
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨  b^{29, 2}_2
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_1
c     b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨  b^{29, 2}_0
c  in DIMACS:
 14894  14895  14896  29  14897 0
 14894  14895  14896  29 -14898 0
 14894  14895  14896  29  14899 0

c  -1-1 --> -2
c    ( b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧  b^{29, 1}_0 ∧ -p_29) -> ( b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0)
c  in CNF:
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨  b^{29, 2}_2
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨  b^{29, 2}_1
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨  p_29 ∨ -b^{29, 2}_0
c  in DIMACS:
-14894  14895 -14896  29  14897 0
-14894  14895 -14896  29  14898 0
-14894  14895 -14896  29 -14899 0

c  -2-1 --> break 
c    ( b^{29, 1}_2 ∧  b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧ -p_29) -> break
c  in CNF:
c    -b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨  b^{29, 1}_0 ∨  p_29 ∨ break
c  in DIMACS:
-14894 -14895  14896  29 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 1}_2 ∧ -b^{29, 1}_1 ∧ -b^{29, 1}_0 ∧ true) 
c  in CNF:
c    -b^{29, 1}_2 ∨  b^{29, 1}_1 ∨  b^{29, 1}_0 ∨ false 
c  in DIMACS:
-14894  14895  14896  0

c  3 does not represent an automaton state.
c    -(-b^{29, 1}_2 ∧  b^{29, 1}_1 ∧  b^{29, 1}_0 ∧ true) 
c  in CNF:
c     b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ false 
c  in DIMACS:
 14894 -14895 -14896  0
c  -3 does not represent an automaton state.
c    -( b^{29, 1}_2 ∧  b^{29, 1}_1 ∧  b^{29, 1}_0 ∧ true) 
c  in CNF:
c    -b^{29, 1}_2 ∨ -b^{29, 1}_1 ∨ -b^{29, 1}_0 ∨ false 
c  in DIMACS:
-14894 -14895 -14896  0

c i = 2
c  -2+1 --> -1
c    ( b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧  p_58) -> ( b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0)
c  in CNF:
c    -b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨  b^{29, 3}_2
c    -b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_1
c    -b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨  b^{29, 3}_0
c  in DIMACS:
-14897 -14898  14899 -58  14900 0
-14897 -14898  14899 -58 -14901 0
-14897 -14898  14899 -58  14902 0

c  -1+1 --> 0
c    ( b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0 ∧  p_58) -> (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧ -b^{29, 3}_0)
c  in CNF:
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_2
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_1
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_0
c  in DIMACS:
-14897  14898 -14899 -58 -14900 0
-14897  14898 -14899 -58 -14901 0
-14897  14898 -14899 -58 -14902 0

c  0+1 --> 1
c    (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧  p_58) -> (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0)
c  in CNF:
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_2
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_1
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨  b^{29, 3}_0
c  in DIMACS:
 14897  14898  14899 -58 -14900 0
 14897  14898  14899 -58 -14901 0
 14897  14898  14899 -58  14902 0

c  1+1 --> 2
c    (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0 ∧  p_58) -> (-b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0)
c  in CNF:
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_2
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨  b^{29, 3}_1
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ -p_58 ∨ -b^{29, 3}_0
c  in DIMACS:
 14897  14898 -14899 -58 -14900 0
 14897  14898 -14899 -58  14901 0
 14897  14898 -14899 -58 -14902 0

c  2+1 --> break 
c    (-b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧  p_58) -> break
c  in CNF:
c     b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ -p_58 ∨ break
c  in DIMACS:
 14897 -14898  14899 -58 1162 0


c  2-1 --> 1
c    (-b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧ -p_58) -> (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0)
c  in CNF:
c     b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_2
c     b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_1
c     b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨  b^{29, 3}_0
c  in DIMACS:
 14897 -14898  14899  58 -14900 0
 14897 -14898  14899  58 -14901 0
 14897 -14898  14899  58  14902 0

c  1-1 --> 0
c    (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0 ∧ -p_58) -> (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧ -b^{29, 3}_0)
c  in CNF:
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_2
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_1
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_0
c  in DIMACS:
 14897  14898 -14899  58 -14900 0
 14897  14898 -14899  58 -14901 0
 14897  14898 -14899  58 -14902 0

c  0-1 --> -1
c    (-b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧ -p_58) -> ( b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0)
c  in CNF:
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨  b^{29, 3}_2
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_1
c     b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨  b^{29, 3}_0
c  in DIMACS:
 14897  14898  14899  58  14900 0
 14897  14898  14899  58 -14901 0
 14897  14898  14899  58  14902 0

c  -1-1 --> -2
c    ( b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧  b^{29, 2}_0 ∧ -p_58) -> ( b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0)
c  in CNF:
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨  b^{29, 3}_2
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨  b^{29, 3}_1
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨  p_58 ∨ -b^{29, 3}_0
c  in DIMACS:
-14897  14898 -14899  58  14900 0
-14897  14898 -14899  58  14901 0
-14897  14898 -14899  58 -14902 0

c  -2-1 --> break 
c    ( b^{29, 2}_2 ∧  b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧ -p_58) -> break
c  in CNF:
c    -b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨  b^{29, 2}_0 ∨  p_58 ∨ break
c  in DIMACS:
-14897 -14898  14899  58 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 2}_2 ∧ -b^{29, 2}_1 ∧ -b^{29, 2}_0 ∧ true) 
c  in CNF:
c    -b^{29, 2}_2 ∨  b^{29, 2}_1 ∨  b^{29, 2}_0 ∨ false 
c  in DIMACS:
-14897  14898  14899  0

c  3 does not represent an automaton state.
c    -(-b^{29, 2}_2 ∧  b^{29, 2}_1 ∧  b^{29, 2}_0 ∧ true) 
c  in CNF:
c     b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ false 
c  in DIMACS:
 14897 -14898 -14899  0
c  -3 does not represent an automaton state.
c    -( b^{29, 2}_2 ∧  b^{29, 2}_1 ∧  b^{29, 2}_0 ∧ true) 
c  in CNF:
c    -b^{29, 2}_2 ∨ -b^{29, 2}_1 ∨ -b^{29, 2}_0 ∨ false 
c  in DIMACS:
-14897 -14898 -14899  0

c i = 3
c  -2+1 --> -1
c    ( b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧  p_87) -> ( b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0)
c  in CNF:
c    -b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨  b^{29, 4}_2
c    -b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_1
c    -b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨  b^{29, 4}_0
c  in DIMACS:
-14900 -14901  14902 -87  14903 0
-14900 -14901  14902 -87 -14904 0
-14900 -14901  14902 -87  14905 0

c  -1+1 --> 0
c    ( b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0 ∧  p_87) -> (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧ -b^{29, 4}_0)
c  in CNF:
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_2
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_1
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_0
c  in DIMACS:
-14900  14901 -14902 -87 -14903 0
-14900  14901 -14902 -87 -14904 0
-14900  14901 -14902 -87 -14905 0

c  0+1 --> 1
c    (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧  p_87) -> (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0)
c  in CNF:
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_2
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_1
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨  b^{29, 4}_0
c  in DIMACS:
 14900  14901  14902 -87 -14903 0
 14900  14901  14902 -87 -14904 0
 14900  14901  14902 -87  14905 0

c  1+1 --> 2
c    (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0 ∧  p_87) -> (-b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0)
c  in CNF:
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_2
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨  b^{29, 4}_1
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ -p_87 ∨ -b^{29, 4}_0
c  in DIMACS:
 14900  14901 -14902 -87 -14903 0
 14900  14901 -14902 -87  14904 0
 14900  14901 -14902 -87 -14905 0

c  2+1 --> break 
c    (-b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧  p_87) -> break
c  in CNF:
c     b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ -p_87 ∨ break
c  in DIMACS:
 14900 -14901  14902 -87 1162 0


c  2-1 --> 1
c    (-b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧ -p_87) -> (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0)
c  in CNF:
c     b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_2
c     b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_1
c     b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨  b^{29, 4}_0
c  in DIMACS:
 14900 -14901  14902  87 -14903 0
 14900 -14901  14902  87 -14904 0
 14900 -14901  14902  87  14905 0

c  1-1 --> 0
c    (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0 ∧ -p_87) -> (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧ -b^{29, 4}_0)
c  in CNF:
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_2
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_1
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_0
c  in DIMACS:
 14900  14901 -14902  87 -14903 0
 14900  14901 -14902  87 -14904 0
 14900  14901 -14902  87 -14905 0

c  0-1 --> -1
c    (-b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧ -p_87) -> ( b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0)
c  in CNF:
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨  b^{29, 4}_2
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_1
c     b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨  b^{29, 4}_0
c  in DIMACS:
 14900  14901  14902  87  14903 0
 14900  14901  14902  87 -14904 0
 14900  14901  14902  87  14905 0

c  -1-1 --> -2
c    ( b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧  b^{29, 3}_0 ∧ -p_87) -> ( b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0)
c  in CNF:
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨  b^{29, 4}_2
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨  b^{29, 4}_1
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨  p_87 ∨ -b^{29, 4}_0
c  in DIMACS:
-14900  14901 -14902  87  14903 0
-14900  14901 -14902  87  14904 0
-14900  14901 -14902  87 -14905 0

c  -2-1 --> break 
c    ( b^{29, 3}_2 ∧  b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧ -p_87) -> break
c  in CNF:
c    -b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨  b^{29, 3}_0 ∨  p_87 ∨ break
c  in DIMACS:
-14900 -14901  14902  87 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 3}_2 ∧ -b^{29, 3}_1 ∧ -b^{29, 3}_0 ∧ true) 
c  in CNF:
c    -b^{29, 3}_2 ∨  b^{29, 3}_1 ∨  b^{29, 3}_0 ∨ false 
c  in DIMACS:
-14900  14901  14902  0

c  3 does not represent an automaton state.
c    -(-b^{29, 3}_2 ∧  b^{29, 3}_1 ∧  b^{29, 3}_0 ∧ true) 
c  in CNF:
c     b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ false 
c  in DIMACS:
 14900 -14901 -14902  0
c  -3 does not represent an automaton state.
c    -( b^{29, 3}_2 ∧  b^{29, 3}_1 ∧  b^{29, 3}_0 ∧ true) 
c  in CNF:
c    -b^{29, 3}_2 ∨ -b^{29, 3}_1 ∨ -b^{29, 3}_0 ∨ false 
c  in DIMACS:
-14900 -14901 -14902  0

c i = 4
c  -2+1 --> -1
c    ( b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧  p_116) -> ( b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0)
c  in CNF:
c    -b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨  b^{29, 5}_2
c    -b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_1
c    -b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨  b^{29, 5}_0
c  in DIMACS:
-14903 -14904  14905 -116  14906 0
-14903 -14904  14905 -116 -14907 0
-14903 -14904  14905 -116  14908 0

c  -1+1 --> 0
c    ( b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0 ∧  p_116) -> (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧ -b^{29, 5}_0)
c  in CNF:
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_2
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_1
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_0
c  in DIMACS:
-14903  14904 -14905 -116 -14906 0
-14903  14904 -14905 -116 -14907 0
-14903  14904 -14905 -116 -14908 0

c  0+1 --> 1
c    (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧  p_116) -> (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0)
c  in CNF:
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_2
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_1
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨  b^{29, 5}_0
c  in DIMACS:
 14903  14904  14905 -116 -14906 0
 14903  14904  14905 -116 -14907 0
 14903  14904  14905 -116  14908 0

c  1+1 --> 2
c    (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0 ∧  p_116) -> (-b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0)
c  in CNF:
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_2
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨  b^{29, 5}_1
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ -p_116 ∨ -b^{29, 5}_0
c  in DIMACS:
 14903  14904 -14905 -116 -14906 0
 14903  14904 -14905 -116  14907 0
 14903  14904 -14905 -116 -14908 0

c  2+1 --> break 
c    (-b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧  p_116) -> break
c  in CNF:
c     b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 14903 -14904  14905 -116 1162 0


c  2-1 --> 1
c    (-b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧ -p_116) -> (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0)
c  in CNF:
c     b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_2
c     b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_1
c     b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨  b^{29, 5}_0
c  in DIMACS:
 14903 -14904  14905  116 -14906 0
 14903 -14904  14905  116 -14907 0
 14903 -14904  14905  116  14908 0

c  1-1 --> 0
c    (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0 ∧ -p_116) -> (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧ -b^{29, 5}_0)
c  in CNF:
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_2
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_1
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_0
c  in DIMACS:
 14903  14904 -14905  116 -14906 0
 14903  14904 -14905  116 -14907 0
 14903  14904 -14905  116 -14908 0

c  0-1 --> -1
c    (-b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧ -p_116) -> ( b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0)
c  in CNF:
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨  b^{29, 5}_2
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_1
c     b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨  b^{29, 5}_0
c  in DIMACS:
 14903  14904  14905  116  14906 0
 14903  14904  14905  116 -14907 0
 14903  14904  14905  116  14908 0

c  -1-1 --> -2
c    ( b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧  b^{29, 4}_0 ∧ -p_116) -> ( b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0)
c  in CNF:
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨  b^{29, 5}_2
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨  b^{29, 5}_1
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨  p_116 ∨ -b^{29, 5}_0
c  in DIMACS:
-14903  14904 -14905  116  14906 0
-14903  14904 -14905  116  14907 0
-14903  14904 -14905  116 -14908 0

c  -2-1 --> break 
c    ( b^{29, 4}_2 ∧  b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨  b^{29, 4}_0 ∨  p_116 ∨ break
c  in DIMACS:
-14903 -14904  14905  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 4}_2 ∧ -b^{29, 4}_1 ∧ -b^{29, 4}_0 ∧ true) 
c  in CNF:
c    -b^{29, 4}_2 ∨  b^{29, 4}_1 ∨  b^{29, 4}_0 ∨ false 
c  in DIMACS:
-14903  14904  14905  0

c  3 does not represent an automaton state.
c    -(-b^{29, 4}_2 ∧  b^{29, 4}_1 ∧  b^{29, 4}_0 ∧ true) 
c  in CNF:
c     b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ false 
c  in DIMACS:
 14903 -14904 -14905  0
c  -3 does not represent an automaton state.
c    -( b^{29, 4}_2 ∧  b^{29, 4}_1 ∧  b^{29, 4}_0 ∧ true) 
c  in CNF:
c    -b^{29, 4}_2 ∨ -b^{29, 4}_1 ∨ -b^{29, 4}_0 ∨ false 
c  in DIMACS:
-14903 -14904 -14905  0

c i = 5
c  -2+1 --> -1
c    ( b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧  p_145) -> ( b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0)
c  in CNF:
c    -b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨  b^{29, 6}_2
c    -b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_1
c    -b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨  b^{29, 6}_0
c  in DIMACS:
-14906 -14907  14908 -145  14909 0
-14906 -14907  14908 -145 -14910 0
-14906 -14907  14908 -145  14911 0

c  -1+1 --> 0
c    ( b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0 ∧  p_145) -> (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧ -b^{29, 6}_0)
c  in CNF:
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_2
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_1
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_0
c  in DIMACS:
-14906  14907 -14908 -145 -14909 0
-14906  14907 -14908 -145 -14910 0
-14906  14907 -14908 -145 -14911 0

c  0+1 --> 1
c    (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧  p_145) -> (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0)
c  in CNF:
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_2
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_1
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨  b^{29, 6}_0
c  in DIMACS:
 14906  14907  14908 -145 -14909 0
 14906  14907  14908 -145 -14910 0
 14906  14907  14908 -145  14911 0

c  1+1 --> 2
c    (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0 ∧  p_145) -> (-b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0)
c  in CNF:
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_2
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨  b^{29, 6}_1
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ -p_145 ∨ -b^{29, 6}_0
c  in DIMACS:
 14906  14907 -14908 -145 -14909 0
 14906  14907 -14908 -145  14910 0
 14906  14907 -14908 -145 -14911 0

c  2+1 --> break 
c    (-b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧  p_145) -> break
c  in CNF:
c     b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ -p_145 ∨ break
c  in DIMACS:
 14906 -14907  14908 -145 1162 0


c  2-1 --> 1
c    (-b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧ -p_145) -> (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0)
c  in CNF:
c     b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_2
c     b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_1
c     b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨  b^{29, 6}_0
c  in DIMACS:
 14906 -14907  14908  145 -14909 0
 14906 -14907  14908  145 -14910 0
 14906 -14907  14908  145  14911 0

c  1-1 --> 0
c    (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0 ∧ -p_145) -> (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧ -b^{29, 6}_0)
c  in CNF:
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_2
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_1
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_0
c  in DIMACS:
 14906  14907 -14908  145 -14909 0
 14906  14907 -14908  145 -14910 0
 14906  14907 -14908  145 -14911 0

c  0-1 --> -1
c    (-b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧ -p_145) -> ( b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0)
c  in CNF:
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨  b^{29, 6}_2
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_1
c     b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨  b^{29, 6}_0
c  in DIMACS:
 14906  14907  14908  145  14909 0
 14906  14907  14908  145 -14910 0
 14906  14907  14908  145  14911 0

c  -1-1 --> -2
c    ( b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧  b^{29, 5}_0 ∧ -p_145) -> ( b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0)
c  in CNF:
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨  b^{29, 6}_2
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨  b^{29, 6}_1
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨  p_145 ∨ -b^{29, 6}_0
c  in DIMACS:
-14906  14907 -14908  145  14909 0
-14906  14907 -14908  145  14910 0
-14906  14907 -14908  145 -14911 0

c  -2-1 --> break 
c    ( b^{29, 5}_2 ∧  b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧ -p_145) -> break
c  in CNF:
c    -b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨  b^{29, 5}_0 ∨  p_145 ∨ break
c  in DIMACS:
-14906 -14907  14908  145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 5}_2 ∧ -b^{29, 5}_1 ∧ -b^{29, 5}_0 ∧ true) 
c  in CNF:
c    -b^{29, 5}_2 ∨  b^{29, 5}_1 ∨  b^{29, 5}_0 ∨ false 
c  in DIMACS:
-14906  14907  14908  0

c  3 does not represent an automaton state.
c    -(-b^{29, 5}_2 ∧  b^{29, 5}_1 ∧  b^{29, 5}_0 ∧ true) 
c  in CNF:
c     b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ false 
c  in DIMACS:
 14906 -14907 -14908  0
c  -3 does not represent an automaton state.
c    -( b^{29, 5}_2 ∧  b^{29, 5}_1 ∧  b^{29, 5}_0 ∧ true) 
c  in CNF:
c    -b^{29, 5}_2 ∨ -b^{29, 5}_1 ∨ -b^{29, 5}_0 ∨ false 
c  in DIMACS:
-14906 -14907 -14908  0

c i = 6
c  -2+1 --> -1
c    ( b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧  p_174) -> ( b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0)
c  in CNF:
c    -b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨  b^{29, 7}_2
c    -b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_1
c    -b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨  b^{29, 7}_0
c  in DIMACS:
-14909 -14910  14911 -174  14912 0
-14909 -14910  14911 -174 -14913 0
-14909 -14910  14911 -174  14914 0

c  -1+1 --> 0
c    ( b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0 ∧  p_174) -> (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧ -b^{29, 7}_0)
c  in CNF:
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_2
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_1
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_0
c  in DIMACS:
-14909  14910 -14911 -174 -14912 0
-14909  14910 -14911 -174 -14913 0
-14909  14910 -14911 -174 -14914 0

c  0+1 --> 1
c    (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧  p_174) -> (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0)
c  in CNF:
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_2
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_1
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨  b^{29, 7}_0
c  in DIMACS:
 14909  14910  14911 -174 -14912 0
 14909  14910  14911 -174 -14913 0
 14909  14910  14911 -174  14914 0

c  1+1 --> 2
c    (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0 ∧  p_174) -> (-b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0)
c  in CNF:
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_2
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨  b^{29, 7}_1
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ -p_174 ∨ -b^{29, 7}_0
c  in DIMACS:
 14909  14910 -14911 -174 -14912 0
 14909  14910 -14911 -174  14913 0
 14909  14910 -14911 -174 -14914 0

c  2+1 --> break 
c    (-b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧  p_174) -> break
c  in CNF:
c     b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 14909 -14910  14911 -174 1162 0


c  2-1 --> 1
c    (-b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧ -p_174) -> (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0)
c  in CNF:
c     b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_2
c     b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_1
c     b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨  b^{29, 7}_0
c  in DIMACS:
 14909 -14910  14911  174 -14912 0
 14909 -14910  14911  174 -14913 0
 14909 -14910  14911  174  14914 0

c  1-1 --> 0
c    (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0 ∧ -p_174) -> (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧ -b^{29, 7}_0)
c  in CNF:
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_2
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_1
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_0
c  in DIMACS:
 14909  14910 -14911  174 -14912 0
 14909  14910 -14911  174 -14913 0
 14909  14910 -14911  174 -14914 0

c  0-1 --> -1
c    (-b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧ -p_174) -> ( b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0)
c  in CNF:
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨  b^{29, 7}_2
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_1
c     b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨  b^{29, 7}_0
c  in DIMACS:
 14909  14910  14911  174  14912 0
 14909  14910  14911  174 -14913 0
 14909  14910  14911  174  14914 0

c  -1-1 --> -2
c    ( b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧  b^{29, 6}_0 ∧ -p_174) -> ( b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0)
c  in CNF:
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨  b^{29, 7}_2
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨  b^{29, 7}_1
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨  p_174 ∨ -b^{29, 7}_0
c  in DIMACS:
-14909  14910 -14911  174  14912 0
-14909  14910 -14911  174  14913 0
-14909  14910 -14911  174 -14914 0

c  -2-1 --> break 
c    ( b^{29, 6}_2 ∧  b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨  b^{29, 6}_0 ∨  p_174 ∨ break
c  in DIMACS:
-14909 -14910  14911  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 6}_2 ∧ -b^{29, 6}_1 ∧ -b^{29, 6}_0 ∧ true) 
c  in CNF:
c    -b^{29, 6}_2 ∨  b^{29, 6}_1 ∨  b^{29, 6}_0 ∨ false 
c  in DIMACS:
-14909  14910  14911  0

c  3 does not represent an automaton state.
c    -(-b^{29, 6}_2 ∧  b^{29, 6}_1 ∧  b^{29, 6}_0 ∧ true) 
c  in CNF:
c     b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ false 
c  in DIMACS:
 14909 -14910 -14911  0
c  -3 does not represent an automaton state.
c    -( b^{29, 6}_2 ∧  b^{29, 6}_1 ∧  b^{29, 6}_0 ∧ true) 
c  in CNF:
c    -b^{29, 6}_2 ∨ -b^{29, 6}_1 ∨ -b^{29, 6}_0 ∨ false 
c  in DIMACS:
-14909 -14910 -14911  0

c i = 7
c  -2+1 --> -1
c    ( b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧  p_203) -> ( b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0)
c  in CNF:
c    -b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨  b^{29, 8}_2
c    -b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_1
c    -b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨  b^{29, 8}_0
c  in DIMACS:
-14912 -14913  14914 -203  14915 0
-14912 -14913  14914 -203 -14916 0
-14912 -14913  14914 -203  14917 0

c  -1+1 --> 0
c    ( b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0 ∧  p_203) -> (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧ -b^{29, 8}_0)
c  in CNF:
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_2
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_1
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_0
c  in DIMACS:
-14912  14913 -14914 -203 -14915 0
-14912  14913 -14914 -203 -14916 0
-14912  14913 -14914 -203 -14917 0

c  0+1 --> 1
c    (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧  p_203) -> (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0)
c  in CNF:
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_2
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_1
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨  b^{29, 8}_0
c  in DIMACS:
 14912  14913  14914 -203 -14915 0
 14912  14913  14914 -203 -14916 0
 14912  14913  14914 -203  14917 0

c  1+1 --> 2
c    (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0 ∧  p_203) -> (-b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0)
c  in CNF:
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_2
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨  b^{29, 8}_1
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ -p_203 ∨ -b^{29, 8}_0
c  in DIMACS:
 14912  14913 -14914 -203 -14915 0
 14912  14913 -14914 -203  14916 0
 14912  14913 -14914 -203 -14917 0

c  2+1 --> break 
c    (-b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧  p_203) -> break
c  in CNF:
c     b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ -p_203 ∨ break
c  in DIMACS:
 14912 -14913  14914 -203 1162 0


c  2-1 --> 1
c    (-b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧ -p_203) -> (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0)
c  in CNF:
c     b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_2
c     b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_1
c     b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨  b^{29, 8}_0
c  in DIMACS:
 14912 -14913  14914  203 -14915 0
 14912 -14913  14914  203 -14916 0
 14912 -14913  14914  203  14917 0

c  1-1 --> 0
c    (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0 ∧ -p_203) -> (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧ -b^{29, 8}_0)
c  in CNF:
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_2
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_1
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_0
c  in DIMACS:
 14912  14913 -14914  203 -14915 0
 14912  14913 -14914  203 -14916 0
 14912  14913 -14914  203 -14917 0

c  0-1 --> -1
c    (-b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧ -p_203) -> ( b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0)
c  in CNF:
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨  b^{29, 8}_2
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_1
c     b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨  b^{29, 8}_0
c  in DIMACS:
 14912  14913  14914  203  14915 0
 14912  14913  14914  203 -14916 0
 14912  14913  14914  203  14917 0

c  -1-1 --> -2
c    ( b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧  b^{29, 7}_0 ∧ -p_203) -> ( b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0)
c  in CNF:
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨  b^{29, 8}_2
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨  b^{29, 8}_1
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨  p_203 ∨ -b^{29, 8}_0
c  in DIMACS:
-14912  14913 -14914  203  14915 0
-14912  14913 -14914  203  14916 0
-14912  14913 -14914  203 -14917 0

c  -2-1 --> break 
c    ( b^{29, 7}_2 ∧  b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧ -p_203) -> break
c  in CNF:
c    -b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨  b^{29, 7}_0 ∨  p_203 ∨ break
c  in DIMACS:
-14912 -14913  14914  203 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 7}_2 ∧ -b^{29, 7}_1 ∧ -b^{29, 7}_0 ∧ true) 
c  in CNF:
c    -b^{29, 7}_2 ∨  b^{29, 7}_1 ∨  b^{29, 7}_0 ∨ false 
c  in DIMACS:
-14912  14913  14914  0

c  3 does not represent an automaton state.
c    -(-b^{29, 7}_2 ∧  b^{29, 7}_1 ∧  b^{29, 7}_0 ∧ true) 
c  in CNF:
c     b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ false 
c  in DIMACS:
 14912 -14913 -14914  0
c  -3 does not represent an automaton state.
c    -( b^{29, 7}_2 ∧  b^{29, 7}_1 ∧  b^{29, 7}_0 ∧ true) 
c  in CNF:
c    -b^{29, 7}_2 ∨ -b^{29, 7}_1 ∨ -b^{29, 7}_0 ∨ false 
c  in DIMACS:
-14912 -14913 -14914  0

c i = 8
c  -2+1 --> -1
c    ( b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧  p_232) -> ( b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0)
c  in CNF:
c    -b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨  b^{29, 9}_2
c    -b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_1
c    -b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨  b^{29, 9}_0
c  in DIMACS:
-14915 -14916  14917 -232  14918 0
-14915 -14916  14917 -232 -14919 0
-14915 -14916  14917 -232  14920 0

c  -1+1 --> 0
c    ( b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0 ∧  p_232) -> (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧ -b^{29, 9}_0)
c  in CNF:
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_2
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_1
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_0
c  in DIMACS:
-14915  14916 -14917 -232 -14918 0
-14915  14916 -14917 -232 -14919 0
-14915  14916 -14917 -232 -14920 0

c  0+1 --> 1
c    (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧  p_232) -> (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0)
c  in CNF:
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_2
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_1
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨  b^{29, 9}_0
c  in DIMACS:
 14915  14916  14917 -232 -14918 0
 14915  14916  14917 -232 -14919 0
 14915  14916  14917 -232  14920 0

c  1+1 --> 2
c    (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0 ∧  p_232) -> (-b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0)
c  in CNF:
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_2
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨  b^{29, 9}_1
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ -p_232 ∨ -b^{29, 9}_0
c  in DIMACS:
 14915  14916 -14917 -232 -14918 0
 14915  14916 -14917 -232  14919 0
 14915  14916 -14917 -232 -14920 0

c  2+1 --> break 
c    (-b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧  p_232) -> break
c  in CNF:
c     b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 14915 -14916  14917 -232 1162 0


c  2-1 --> 1
c    (-b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧ -p_232) -> (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0)
c  in CNF:
c     b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_2
c     b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_1
c     b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨  b^{29, 9}_0
c  in DIMACS:
 14915 -14916  14917  232 -14918 0
 14915 -14916  14917  232 -14919 0
 14915 -14916  14917  232  14920 0

c  1-1 --> 0
c    (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0 ∧ -p_232) -> (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧ -b^{29, 9}_0)
c  in CNF:
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_2
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_1
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_0
c  in DIMACS:
 14915  14916 -14917  232 -14918 0
 14915  14916 -14917  232 -14919 0
 14915  14916 -14917  232 -14920 0

c  0-1 --> -1
c    (-b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧ -p_232) -> ( b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0)
c  in CNF:
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨  b^{29, 9}_2
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_1
c     b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨  b^{29, 9}_0
c  in DIMACS:
 14915  14916  14917  232  14918 0
 14915  14916  14917  232 -14919 0
 14915  14916  14917  232  14920 0

c  -1-1 --> -2
c    ( b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧  b^{29, 8}_0 ∧ -p_232) -> ( b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0)
c  in CNF:
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨  b^{29, 9}_2
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨  b^{29, 9}_1
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨  p_232 ∨ -b^{29, 9}_0
c  in DIMACS:
-14915  14916 -14917  232  14918 0
-14915  14916 -14917  232  14919 0
-14915  14916 -14917  232 -14920 0

c  -2-1 --> break 
c    ( b^{29, 8}_2 ∧  b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨  b^{29, 8}_0 ∨  p_232 ∨ break
c  in DIMACS:
-14915 -14916  14917  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 8}_2 ∧ -b^{29, 8}_1 ∧ -b^{29, 8}_0 ∧ true) 
c  in CNF:
c    -b^{29, 8}_2 ∨  b^{29, 8}_1 ∨  b^{29, 8}_0 ∨ false 
c  in DIMACS:
-14915  14916  14917  0

c  3 does not represent an automaton state.
c    -(-b^{29, 8}_2 ∧  b^{29, 8}_1 ∧  b^{29, 8}_0 ∧ true) 
c  in CNF:
c     b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ false 
c  in DIMACS:
 14915 -14916 -14917  0
c  -3 does not represent an automaton state.
c    -( b^{29, 8}_2 ∧  b^{29, 8}_1 ∧  b^{29, 8}_0 ∧ true) 
c  in CNF:
c    -b^{29, 8}_2 ∨ -b^{29, 8}_1 ∨ -b^{29, 8}_0 ∨ false 
c  in DIMACS:
-14915 -14916 -14917  0

c i = 9
c  -2+1 --> -1
c    ( b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧  p_261) -> ( b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0)
c  in CNF:
c    -b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨  b^{29, 10}_2
c    -b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_1
c    -b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨  b^{29, 10}_0
c  in DIMACS:
-14918 -14919  14920 -261  14921 0
-14918 -14919  14920 -261 -14922 0
-14918 -14919  14920 -261  14923 0

c  -1+1 --> 0
c    ( b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0 ∧  p_261) -> (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧ -b^{29, 10}_0)
c  in CNF:
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_2
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_1
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_0
c  in DIMACS:
-14918  14919 -14920 -261 -14921 0
-14918  14919 -14920 -261 -14922 0
-14918  14919 -14920 -261 -14923 0

c  0+1 --> 1
c    (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧  p_261) -> (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0)
c  in CNF:
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_2
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_1
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨  b^{29, 10}_0
c  in DIMACS:
 14918  14919  14920 -261 -14921 0
 14918  14919  14920 -261 -14922 0
 14918  14919  14920 -261  14923 0

c  1+1 --> 2
c    (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0 ∧  p_261) -> (-b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0)
c  in CNF:
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_2
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨  b^{29, 10}_1
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ -p_261 ∨ -b^{29, 10}_0
c  in DIMACS:
 14918  14919 -14920 -261 -14921 0
 14918  14919 -14920 -261  14922 0
 14918  14919 -14920 -261 -14923 0

c  2+1 --> break 
c    (-b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧  p_261) -> break
c  in CNF:
c     b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 14918 -14919  14920 -261 1162 0


c  2-1 --> 1
c    (-b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧ -p_261) -> (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0)
c  in CNF:
c     b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_2
c     b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_1
c     b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨  b^{29, 10}_0
c  in DIMACS:
 14918 -14919  14920  261 -14921 0
 14918 -14919  14920  261 -14922 0
 14918 -14919  14920  261  14923 0

c  1-1 --> 0
c    (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0 ∧ -p_261) -> (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧ -b^{29, 10}_0)
c  in CNF:
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_2
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_1
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_0
c  in DIMACS:
 14918  14919 -14920  261 -14921 0
 14918  14919 -14920  261 -14922 0
 14918  14919 -14920  261 -14923 0

c  0-1 --> -1
c    (-b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧ -p_261) -> ( b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0)
c  in CNF:
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨  b^{29, 10}_2
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_1
c     b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨  b^{29, 10}_0
c  in DIMACS:
 14918  14919  14920  261  14921 0
 14918  14919  14920  261 -14922 0
 14918  14919  14920  261  14923 0

c  -1-1 --> -2
c    ( b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧  b^{29, 9}_0 ∧ -p_261) -> ( b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0)
c  in CNF:
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨  b^{29, 10}_2
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨  b^{29, 10}_1
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨  p_261 ∨ -b^{29, 10}_0
c  in DIMACS:
-14918  14919 -14920  261  14921 0
-14918  14919 -14920  261  14922 0
-14918  14919 -14920  261 -14923 0

c  -2-1 --> break 
c    ( b^{29, 9}_2 ∧  b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨  b^{29, 9}_0 ∨  p_261 ∨ break
c  in DIMACS:
-14918 -14919  14920  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 9}_2 ∧ -b^{29, 9}_1 ∧ -b^{29, 9}_0 ∧ true) 
c  in CNF:
c    -b^{29, 9}_2 ∨  b^{29, 9}_1 ∨  b^{29, 9}_0 ∨ false 
c  in DIMACS:
-14918  14919  14920  0

c  3 does not represent an automaton state.
c    -(-b^{29, 9}_2 ∧  b^{29, 9}_1 ∧  b^{29, 9}_0 ∧ true) 
c  in CNF:
c     b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ false 
c  in DIMACS:
 14918 -14919 -14920  0
c  -3 does not represent an automaton state.
c    -( b^{29, 9}_2 ∧  b^{29, 9}_1 ∧  b^{29, 9}_0 ∧ true) 
c  in CNF:
c    -b^{29, 9}_2 ∨ -b^{29, 9}_1 ∨ -b^{29, 9}_0 ∨ false 
c  in DIMACS:
-14918 -14919 -14920  0

c i = 10
c  -2+1 --> -1
c    ( b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧  p_290) -> ( b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0)
c  in CNF:
c    -b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨  b^{29, 11}_2
c    -b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_1
c    -b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨  b^{29, 11}_0
c  in DIMACS:
-14921 -14922  14923 -290  14924 0
-14921 -14922  14923 -290 -14925 0
-14921 -14922  14923 -290  14926 0

c  -1+1 --> 0
c    ( b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0 ∧  p_290) -> (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧ -b^{29, 11}_0)
c  in CNF:
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_2
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_1
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_0
c  in DIMACS:
-14921  14922 -14923 -290 -14924 0
-14921  14922 -14923 -290 -14925 0
-14921  14922 -14923 -290 -14926 0

c  0+1 --> 1
c    (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧  p_290) -> (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0)
c  in CNF:
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_2
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_1
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨  b^{29, 11}_0
c  in DIMACS:
 14921  14922  14923 -290 -14924 0
 14921  14922  14923 -290 -14925 0
 14921  14922  14923 -290  14926 0

c  1+1 --> 2
c    (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0 ∧  p_290) -> (-b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0)
c  in CNF:
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_2
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨  b^{29, 11}_1
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ -p_290 ∨ -b^{29, 11}_0
c  in DIMACS:
 14921  14922 -14923 -290 -14924 0
 14921  14922 -14923 -290  14925 0
 14921  14922 -14923 -290 -14926 0

c  2+1 --> break 
c    (-b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧  p_290) -> break
c  in CNF:
c     b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 14921 -14922  14923 -290 1162 0


c  2-1 --> 1
c    (-b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧ -p_290) -> (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0)
c  in CNF:
c     b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_2
c     b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_1
c     b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨  b^{29, 11}_0
c  in DIMACS:
 14921 -14922  14923  290 -14924 0
 14921 -14922  14923  290 -14925 0
 14921 -14922  14923  290  14926 0

c  1-1 --> 0
c    (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0 ∧ -p_290) -> (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧ -b^{29, 11}_0)
c  in CNF:
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_2
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_1
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_0
c  in DIMACS:
 14921  14922 -14923  290 -14924 0
 14921  14922 -14923  290 -14925 0
 14921  14922 -14923  290 -14926 0

c  0-1 --> -1
c    (-b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧ -p_290) -> ( b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0)
c  in CNF:
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨  b^{29, 11}_2
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_1
c     b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨  b^{29, 11}_0
c  in DIMACS:
 14921  14922  14923  290  14924 0
 14921  14922  14923  290 -14925 0
 14921  14922  14923  290  14926 0

c  -1-1 --> -2
c    ( b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧  b^{29, 10}_0 ∧ -p_290) -> ( b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0)
c  in CNF:
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨  b^{29, 11}_2
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨  b^{29, 11}_1
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨  p_290 ∨ -b^{29, 11}_0
c  in DIMACS:
-14921  14922 -14923  290  14924 0
-14921  14922 -14923  290  14925 0
-14921  14922 -14923  290 -14926 0

c  -2-1 --> break 
c    ( b^{29, 10}_2 ∧  b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨  b^{29, 10}_0 ∨  p_290 ∨ break
c  in DIMACS:
-14921 -14922  14923  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 10}_2 ∧ -b^{29, 10}_1 ∧ -b^{29, 10}_0 ∧ true) 
c  in CNF:
c    -b^{29, 10}_2 ∨  b^{29, 10}_1 ∨  b^{29, 10}_0 ∨ false 
c  in DIMACS:
-14921  14922  14923  0

c  3 does not represent an automaton state.
c    -(-b^{29, 10}_2 ∧  b^{29, 10}_1 ∧  b^{29, 10}_0 ∧ true) 
c  in CNF:
c     b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ false 
c  in DIMACS:
 14921 -14922 -14923  0
c  -3 does not represent an automaton state.
c    -( b^{29, 10}_2 ∧  b^{29, 10}_1 ∧  b^{29, 10}_0 ∧ true) 
c  in CNF:
c    -b^{29, 10}_2 ∨ -b^{29, 10}_1 ∨ -b^{29, 10}_0 ∨ false 
c  in DIMACS:
-14921 -14922 -14923  0

c i = 11
c  -2+1 --> -1
c    ( b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧  p_319) -> ( b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0)
c  in CNF:
c    -b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨  b^{29, 12}_2
c    -b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_1
c    -b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨  b^{29, 12}_0
c  in DIMACS:
-14924 -14925  14926 -319  14927 0
-14924 -14925  14926 -319 -14928 0
-14924 -14925  14926 -319  14929 0

c  -1+1 --> 0
c    ( b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0 ∧  p_319) -> (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧ -b^{29, 12}_0)
c  in CNF:
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_2
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_1
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_0
c  in DIMACS:
-14924  14925 -14926 -319 -14927 0
-14924  14925 -14926 -319 -14928 0
-14924  14925 -14926 -319 -14929 0

c  0+1 --> 1
c    (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧  p_319) -> (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0)
c  in CNF:
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_2
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_1
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨  b^{29, 12}_0
c  in DIMACS:
 14924  14925  14926 -319 -14927 0
 14924  14925  14926 -319 -14928 0
 14924  14925  14926 -319  14929 0

c  1+1 --> 2
c    (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0 ∧  p_319) -> (-b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0)
c  in CNF:
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_2
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨  b^{29, 12}_1
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ -p_319 ∨ -b^{29, 12}_0
c  in DIMACS:
 14924  14925 -14926 -319 -14927 0
 14924  14925 -14926 -319  14928 0
 14924  14925 -14926 -319 -14929 0

c  2+1 --> break 
c    (-b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧  p_319) -> break
c  in CNF:
c     b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ -p_319 ∨ break
c  in DIMACS:
 14924 -14925  14926 -319 1162 0


c  2-1 --> 1
c    (-b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧ -p_319) -> (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0)
c  in CNF:
c     b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_2
c     b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_1
c     b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨  b^{29, 12}_0
c  in DIMACS:
 14924 -14925  14926  319 -14927 0
 14924 -14925  14926  319 -14928 0
 14924 -14925  14926  319  14929 0

c  1-1 --> 0
c    (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0 ∧ -p_319) -> (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧ -b^{29, 12}_0)
c  in CNF:
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_2
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_1
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_0
c  in DIMACS:
 14924  14925 -14926  319 -14927 0
 14924  14925 -14926  319 -14928 0
 14924  14925 -14926  319 -14929 0

c  0-1 --> -1
c    (-b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧ -p_319) -> ( b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0)
c  in CNF:
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨  b^{29, 12}_2
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_1
c     b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨  b^{29, 12}_0
c  in DIMACS:
 14924  14925  14926  319  14927 0
 14924  14925  14926  319 -14928 0
 14924  14925  14926  319  14929 0

c  -1-1 --> -2
c    ( b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧  b^{29, 11}_0 ∧ -p_319) -> ( b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0)
c  in CNF:
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨  b^{29, 12}_2
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨  b^{29, 12}_1
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨  p_319 ∨ -b^{29, 12}_0
c  in DIMACS:
-14924  14925 -14926  319  14927 0
-14924  14925 -14926  319  14928 0
-14924  14925 -14926  319 -14929 0

c  -2-1 --> break 
c    ( b^{29, 11}_2 ∧  b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧ -p_319) -> break
c  in CNF:
c    -b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨  b^{29, 11}_0 ∨  p_319 ∨ break
c  in DIMACS:
-14924 -14925  14926  319 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 11}_2 ∧ -b^{29, 11}_1 ∧ -b^{29, 11}_0 ∧ true) 
c  in CNF:
c    -b^{29, 11}_2 ∨  b^{29, 11}_1 ∨  b^{29, 11}_0 ∨ false 
c  in DIMACS:
-14924  14925  14926  0

c  3 does not represent an automaton state.
c    -(-b^{29, 11}_2 ∧  b^{29, 11}_1 ∧  b^{29, 11}_0 ∧ true) 
c  in CNF:
c     b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ false 
c  in DIMACS:
 14924 -14925 -14926  0
c  -3 does not represent an automaton state.
c    -( b^{29, 11}_2 ∧  b^{29, 11}_1 ∧  b^{29, 11}_0 ∧ true) 
c  in CNF:
c    -b^{29, 11}_2 ∨ -b^{29, 11}_1 ∨ -b^{29, 11}_0 ∨ false 
c  in DIMACS:
-14924 -14925 -14926  0

c i = 12
c  -2+1 --> -1
c    ( b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧  p_348) -> ( b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0)
c  in CNF:
c    -b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨  b^{29, 13}_2
c    -b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_1
c    -b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨  b^{29, 13}_0
c  in DIMACS:
-14927 -14928  14929 -348  14930 0
-14927 -14928  14929 -348 -14931 0
-14927 -14928  14929 -348  14932 0

c  -1+1 --> 0
c    ( b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0 ∧  p_348) -> (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧ -b^{29, 13}_0)
c  in CNF:
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_2
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_1
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_0
c  in DIMACS:
-14927  14928 -14929 -348 -14930 0
-14927  14928 -14929 -348 -14931 0
-14927  14928 -14929 -348 -14932 0

c  0+1 --> 1
c    (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧  p_348) -> (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0)
c  in CNF:
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_2
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_1
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨  b^{29, 13}_0
c  in DIMACS:
 14927  14928  14929 -348 -14930 0
 14927  14928  14929 -348 -14931 0
 14927  14928  14929 -348  14932 0

c  1+1 --> 2
c    (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0 ∧  p_348) -> (-b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0)
c  in CNF:
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_2
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨  b^{29, 13}_1
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ -p_348 ∨ -b^{29, 13}_0
c  in DIMACS:
 14927  14928 -14929 -348 -14930 0
 14927  14928 -14929 -348  14931 0
 14927  14928 -14929 -348 -14932 0

c  2+1 --> break 
c    (-b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧  p_348) -> break
c  in CNF:
c     b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 14927 -14928  14929 -348 1162 0


c  2-1 --> 1
c    (-b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧ -p_348) -> (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0)
c  in CNF:
c     b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_2
c     b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_1
c     b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨  b^{29, 13}_0
c  in DIMACS:
 14927 -14928  14929  348 -14930 0
 14927 -14928  14929  348 -14931 0
 14927 -14928  14929  348  14932 0

c  1-1 --> 0
c    (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0 ∧ -p_348) -> (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧ -b^{29, 13}_0)
c  in CNF:
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_2
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_1
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_0
c  in DIMACS:
 14927  14928 -14929  348 -14930 0
 14927  14928 -14929  348 -14931 0
 14927  14928 -14929  348 -14932 0

c  0-1 --> -1
c    (-b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧ -p_348) -> ( b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0)
c  in CNF:
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨  b^{29, 13}_2
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_1
c     b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨  b^{29, 13}_0
c  in DIMACS:
 14927  14928  14929  348  14930 0
 14927  14928  14929  348 -14931 0
 14927  14928  14929  348  14932 0

c  -1-1 --> -2
c    ( b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧  b^{29, 12}_0 ∧ -p_348) -> ( b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0)
c  in CNF:
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨  b^{29, 13}_2
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨  b^{29, 13}_1
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨  p_348 ∨ -b^{29, 13}_0
c  in DIMACS:
-14927  14928 -14929  348  14930 0
-14927  14928 -14929  348  14931 0
-14927  14928 -14929  348 -14932 0

c  -2-1 --> break 
c    ( b^{29, 12}_2 ∧  b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨  b^{29, 12}_0 ∨  p_348 ∨ break
c  in DIMACS:
-14927 -14928  14929  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 12}_2 ∧ -b^{29, 12}_1 ∧ -b^{29, 12}_0 ∧ true) 
c  in CNF:
c    -b^{29, 12}_2 ∨  b^{29, 12}_1 ∨  b^{29, 12}_0 ∨ false 
c  in DIMACS:
-14927  14928  14929  0

c  3 does not represent an automaton state.
c    -(-b^{29, 12}_2 ∧  b^{29, 12}_1 ∧  b^{29, 12}_0 ∧ true) 
c  in CNF:
c     b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ false 
c  in DIMACS:
 14927 -14928 -14929  0
c  -3 does not represent an automaton state.
c    -( b^{29, 12}_2 ∧  b^{29, 12}_1 ∧  b^{29, 12}_0 ∧ true) 
c  in CNF:
c    -b^{29, 12}_2 ∨ -b^{29, 12}_1 ∨ -b^{29, 12}_0 ∨ false 
c  in DIMACS:
-14927 -14928 -14929  0

c i = 13
c  -2+1 --> -1
c    ( b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧  p_377) -> ( b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0)
c  in CNF:
c    -b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨  b^{29, 14}_2
c    -b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_1
c    -b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨  b^{29, 14}_0
c  in DIMACS:
-14930 -14931  14932 -377  14933 0
-14930 -14931  14932 -377 -14934 0
-14930 -14931  14932 -377  14935 0

c  -1+1 --> 0
c    ( b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0 ∧  p_377) -> (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧ -b^{29, 14}_0)
c  in CNF:
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_2
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_1
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_0
c  in DIMACS:
-14930  14931 -14932 -377 -14933 0
-14930  14931 -14932 -377 -14934 0
-14930  14931 -14932 -377 -14935 0

c  0+1 --> 1
c    (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧  p_377) -> (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0)
c  in CNF:
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_2
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_1
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨  b^{29, 14}_0
c  in DIMACS:
 14930  14931  14932 -377 -14933 0
 14930  14931  14932 -377 -14934 0
 14930  14931  14932 -377  14935 0

c  1+1 --> 2
c    (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0 ∧  p_377) -> (-b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0)
c  in CNF:
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_2
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨  b^{29, 14}_1
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ -p_377 ∨ -b^{29, 14}_0
c  in DIMACS:
 14930  14931 -14932 -377 -14933 0
 14930  14931 -14932 -377  14934 0
 14930  14931 -14932 -377 -14935 0

c  2+1 --> break 
c    (-b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧  p_377) -> break
c  in CNF:
c     b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ -p_377 ∨ break
c  in DIMACS:
 14930 -14931  14932 -377 1162 0


c  2-1 --> 1
c    (-b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧ -p_377) -> (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0)
c  in CNF:
c     b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_2
c     b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_1
c     b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨  b^{29, 14}_0
c  in DIMACS:
 14930 -14931  14932  377 -14933 0
 14930 -14931  14932  377 -14934 0
 14930 -14931  14932  377  14935 0

c  1-1 --> 0
c    (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0 ∧ -p_377) -> (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧ -b^{29, 14}_0)
c  in CNF:
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_2
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_1
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_0
c  in DIMACS:
 14930  14931 -14932  377 -14933 0
 14930  14931 -14932  377 -14934 0
 14930  14931 -14932  377 -14935 0

c  0-1 --> -1
c    (-b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧ -p_377) -> ( b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0)
c  in CNF:
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨  b^{29, 14}_2
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_1
c     b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨  b^{29, 14}_0
c  in DIMACS:
 14930  14931  14932  377  14933 0
 14930  14931  14932  377 -14934 0
 14930  14931  14932  377  14935 0

c  -1-1 --> -2
c    ( b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧  b^{29, 13}_0 ∧ -p_377) -> ( b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0)
c  in CNF:
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨  b^{29, 14}_2
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨  b^{29, 14}_1
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨  p_377 ∨ -b^{29, 14}_0
c  in DIMACS:
-14930  14931 -14932  377  14933 0
-14930  14931 -14932  377  14934 0
-14930  14931 -14932  377 -14935 0

c  -2-1 --> break 
c    ( b^{29, 13}_2 ∧  b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧ -p_377) -> break
c  in CNF:
c    -b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨  b^{29, 13}_0 ∨  p_377 ∨ break
c  in DIMACS:
-14930 -14931  14932  377 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 13}_2 ∧ -b^{29, 13}_1 ∧ -b^{29, 13}_0 ∧ true) 
c  in CNF:
c    -b^{29, 13}_2 ∨  b^{29, 13}_1 ∨  b^{29, 13}_0 ∨ false 
c  in DIMACS:
-14930  14931  14932  0

c  3 does not represent an automaton state.
c    -(-b^{29, 13}_2 ∧  b^{29, 13}_1 ∧  b^{29, 13}_0 ∧ true) 
c  in CNF:
c     b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ false 
c  in DIMACS:
 14930 -14931 -14932  0
c  -3 does not represent an automaton state.
c    -( b^{29, 13}_2 ∧  b^{29, 13}_1 ∧  b^{29, 13}_0 ∧ true) 
c  in CNF:
c    -b^{29, 13}_2 ∨ -b^{29, 13}_1 ∨ -b^{29, 13}_0 ∨ false 
c  in DIMACS:
-14930 -14931 -14932  0

c i = 14
c  -2+1 --> -1
c    ( b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧  p_406) -> ( b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0)
c  in CNF:
c    -b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨  b^{29, 15}_2
c    -b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_1
c    -b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨  b^{29, 15}_0
c  in DIMACS:
-14933 -14934  14935 -406  14936 0
-14933 -14934  14935 -406 -14937 0
-14933 -14934  14935 -406  14938 0

c  -1+1 --> 0
c    ( b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0 ∧  p_406) -> (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧ -b^{29, 15}_0)
c  in CNF:
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_2
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_1
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_0
c  in DIMACS:
-14933  14934 -14935 -406 -14936 0
-14933  14934 -14935 -406 -14937 0
-14933  14934 -14935 -406 -14938 0

c  0+1 --> 1
c    (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧  p_406) -> (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0)
c  in CNF:
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_2
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_1
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨  b^{29, 15}_0
c  in DIMACS:
 14933  14934  14935 -406 -14936 0
 14933  14934  14935 -406 -14937 0
 14933  14934  14935 -406  14938 0

c  1+1 --> 2
c    (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0 ∧  p_406) -> (-b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0)
c  in CNF:
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_2
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨  b^{29, 15}_1
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ -p_406 ∨ -b^{29, 15}_0
c  in DIMACS:
 14933  14934 -14935 -406 -14936 0
 14933  14934 -14935 -406  14937 0
 14933  14934 -14935 -406 -14938 0

c  2+1 --> break 
c    (-b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧  p_406) -> break
c  in CNF:
c     b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 14933 -14934  14935 -406 1162 0


c  2-1 --> 1
c    (-b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧ -p_406) -> (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0)
c  in CNF:
c     b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_2
c     b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_1
c     b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨  b^{29, 15}_0
c  in DIMACS:
 14933 -14934  14935  406 -14936 0
 14933 -14934  14935  406 -14937 0
 14933 -14934  14935  406  14938 0

c  1-1 --> 0
c    (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0 ∧ -p_406) -> (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧ -b^{29, 15}_0)
c  in CNF:
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_2
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_1
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_0
c  in DIMACS:
 14933  14934 -14935  406 -14936 0
 14933  14934 -14935  406 -14937 0
 14933  14934 -14935  406 -14938 0

c  0-1 --> -1
c    (-b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧ -p_406) -> ( b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0)
c  in CNF:
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨  b^{29, 15}_2
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_1
c     b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨  b^{29, 15}_0
c  in DIMACS:
 14933  14934  14935  406  14936 0
 14933  14934  14935  406 -14937 0
 14933  14934  14935  406  14938 0

c  -1-1 --> -2
c    ( b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧  b^{29, 14}_0 ∧ -p_406) -> ( b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0)
c  in CNF:
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨  b^{29, 15}_2
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨  b^{29, 15}_1
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨  p_406 ∨ -b^{29, 15}_0
c  in DIMACS:
-14933  14934 -14935  406  14936 0
-14933  14934 -14935  406  14937 0
-14933  14934 -14935  406 -14938 0

c  -2-1 --> break 
c    ( b^{29, 14}_2 ∧  b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨  b^{29, 14}_0 ∨  p_406 ∨ break
c  in DIMACS:
-14933 -14934  14935  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 14}_2 ∧ -b^{29, 14}_1 ∧ -b^{29, 14}_0 ∧ true) 
c  in CNF:
c    -b^{29, 14}_2 ∨  b^{29, 14}_1 ∨  b^{29, 14}_0 ∨ false 
c  in DIMACS:
-14933  14934  14935  0

c  3 does not represent an automaton state.
c    -(-b^{29, 14}_2 ∧  b^{29, 14}_1 ∧  b^{29, 14}_0 ∧ true) 
c  in CNF:
c     b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ false 
c  in DIMACS:
 14933 -14934 -14935  0
c  -3 does not represent an automaton state.
c    -( b^{29, 14}_2 ∧  b^{29, 14}_1 ∧  b^{29, 14}_0 ∧ true) 
c  in CNF:
c    -b^{29, 14}_2 ∨ -b^{29, 14}_1 ∨ -b^{29, 14}_0 ∨ false 
c  in DIMACS:
-14933 -14934 -14935  0

c i = 15
c  -2+1 --> -1
c    ( b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧  p_435) -> ( b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0)
c  in CNF:
c    -b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨  b^{29, 16}_2
c    -b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_1
c    -b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨  b^{29, 16}_0
c  in DIMACS:
-14936 -14937  14938 -435  14939 0
-14936 -14937  14938 -435 -14940 0
-14936 -14937  14938 -435  14941 0

c  -1+1 --> 0
c    ( b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0 ∧  p_435) -> (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧ -b^{29, 16}_0)
c  in CNF:
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_2
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_1
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_0
c  in DIMACS:
-14936  14937 -14938 -435 -14939 0
-14936  14937 -14938 -435 -14940 0
-14936  14937 -14938 -435 -14941 0

c  0+1 --> 1
c    (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧  p_435) -> (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0)
c  in CNF:
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_2
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_1
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨  b^{29, 16}_0
c  in DIMACS:
 14936  14937  14938 -435 -14939 0
 14936  14937  14938 -435 -14940 0
 14936  14937  14938 -435  14941 0

c  1+1 --> 2
c    (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0 ∧  p_435) -> (-b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0)
c  in CNF:
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_2
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨  b^{29, 16}_1
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ -p_435 ∨ -b^{29, 16}_0
c  in DIMACS:
 14936  14937 -14938 -435 -14939 0
 14936  14937 -14938 -435  14940 0
 14936  14937 -14938 -435 -14941 0

c  2+1 --> break 
c    (-b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧  p_435) -> break
c  in CNF:
c     b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 14936 -14937  14938 -435 1162 0


c  2-1 --> 1
c    (-b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧ -p_435) -> (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0)
c  in CNF:
c     b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_2
c     b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_1
c     b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨  b^{29, 16}_0
c  in DIMACS:
 14936 -14937  14938  435 -14939 0
 14936 -14937  14938  435 -14940 0
 14936 -14937  14938  435  14941 0

c  1-1 --> 0
c    (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0 ∧ -p_435) -> (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧ -b^{29, 16}_0)
c  in CNF:
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_2
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_1
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_0
c  in DIMACS:
 14936  14937 -14938  435 -14939 0
 14936  14937 -14938  435 -14940 0
 14936  14937 -14938  435 -14941 0

c  0-1 --> -1
c    (-b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧ -p_435) -> ( b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0)
c  in CNF:
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨  b^{29, 16}_2
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_1
c     b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨  b^{29, 16}_0
c  in DIMACS:
 14936  14937  14938  435  14939 0
 14936  14937  14938  435 -14940 0
 14936  14937  14938  435  14941 0

c  -1-1 --> -2
c    ( b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧  b^{29, 15}_0 ∧ -p_435) -> ( b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0)
c  in CNF:
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨  b^{29, 16}_2
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨  b^{29, 16}_1
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨  p_435 ∨ -b^{29, 16}_0
c  in DIMACS:
-14936  14937 -14938  435  14939 0
-14936  14937 -14938  435  14940 0
-14936  14937 -14938  435 -14941 0

c  -2-1 --> break 
c    ( b^{29, 15}_2 ∧  b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨  b^{29, 15}_0 ∨  p_435 ∨ break
c  in DIMACS:
-14936 -14937  14938  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 15}_2 ∧ -b^{29, 15}_1 ∧ -b^{29, 15}_0 ∧ true) 
c  in CNF:
c    -b^{29, 15}_2 ∨  b^{29, 15}_1 ∨  b^{29, 15}_0 ∨ false 
c  in DIMACS:
-14936  14937  14938  0

c  3 does not represent an automaton state.
c    -(-b^{29, 15}_2 ∧  b^{29, 15}_1 ∧  b^{29, 15}_0 ∧ true) 
c  in CNF:
c     b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ false 
c  in DIMACS:
 14936 -14937 -14938  0
c  -3 does not represent an automaton state.
c    -( b^{29, 15}_2 ∧  b^{29, 15}_1 ∧  b^{29, 15}_0 ∧ true) 
c  in CNF:
c    -b^{29, 15}_2 ∨ -b^{29, 15}_1 ∨ -b^{29, 15}_0 ∨ false 
c  in DIMACS:
-14936 -14937 -14938  0

c i = 16
c  -2+1 --> -1
c    ( b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧  p_464) -> ( b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0)
c  in CNF:
c    -b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨  b^{29, 17}_2
c    -b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_1
c    -b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨  b^{29, 17}_0
c  in DIMACS:
-14939 -14940  14941 -464  14942 0
-14939 -14940  14941 -464 -14943 0
-14939 -14940  14941 -464  14944 0

c  -1+1 --> 0
c    ( b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0 ∧  p_464) -> (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧ -b^{29, 17}_0)
c  in CNF:
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_2
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_1
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_0
c  in DIMACS:
-14939  14940 -14941 -464 -14942 0
-14939  14940 -14941 -464 -14943 0
-14939  14940 -14941 -464 -14944 0

c  0+1 --> 1
c    (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧  p_464) -> (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0)
c  in CNF:
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_2
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_1
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨  b^{29, 17}_0
c  in DIMACS:
 14939  14940  14941 -464 -14942 0
 14939  14940  14941 -464 -14943 0
 14939  14940  14941 -464  14944 0

c  1+1 --> 2
c    (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0 ∧  p_464) -> (-b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0)
c  in CNF:
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_2
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨  b^{29, 17}_1
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ -p_464 ∨ -b^{29, 17}_0
c  in DIMACS:
 14939  14940 -14941 -464 -14942 0
 14939  14940 -14941 -464  14943 0
 14939  14940 -14941 -464 -14944 0

c  2+1 --> break 
c    (-b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧  p_464) -> break
c  in CNF:
c     b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 14939 -14940  14941 -464 1162 0


c  2-1 --> 1
c    (-b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧ -p_464) -> (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0)
c  in CNF:
c     b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_2
c     b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_1
c     b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨  b^{29, 17}_0
c  in DIMACS:
 14939 -14940  14941  464 -14942 0
 14939 -14940  14941  464 -14943 0
 14939 -14940  14941  464  14944 0

c  1-1 --> 0
c    (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0 ∧ -p_464) -> (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧ -b^{29, 17}_0)
c  in CNF:
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_2
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_1
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_0
c  in DIMACS:
 14939  14940 -14941  464 -14942 0
 14939  14940 -14941  464 -14943 0
 14939  14940 -14941  464 -14944 0

c  0-1 --> -1
c    (-b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧ -p_464) -> ( b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0)
c  in CNF:
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨  b^{29, 17}_2
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_1
c     b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨  b^{29, 17}_0
c  in DIMACS:
 14939  14940  14941  464  14942 0
 14939  14940  14941  464 -14943 0
 14939  14940  14941  464  14944 0

c  -1-1 --> -2
c    ( b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧  b^{29, 16}_0 ∧ -p_464) -> ( b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0)
c  in CNF:
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨  b^{29, 17}_2
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨  b^{29, 17}_1
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨  p_464 ∨ -b^{29, 17}_0
c  in DIMACS:
-14939  14940 -14941  464  14942 0
-14939  14940 -14941  464  14943 0
-14939  14940 -14941  464 -14944 0

c  -2-1 --> break 
c    ( b^{29, 16}_2 ∧  b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨  b^{29, 16}_0 ∨  p_464 ∨ break
c  in DIMACS:
-14939 -14940  14941  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 16}_2 ∧ -b^{29, 16}_1 ∧ -b^{29, 16}_0 ∧ true) 
c  in CNF:
c    -b^{29, 16}_2 ∨  b^{29, 16}_1 ∨  b^{29, 16}_0 ∨ false 
c  in DIMACS:
-14939  14940  14941  0

c  3 does not represent an automaton state.
c    -(-b^{29, 16}_2 ∧  b^{29, 16}_1 ∧  b^{29, 16}_0 ∧ true) 
c  in CNF:
c     b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ false 
c  in DIMACS:
 14939 -14940 -14941  0
c  -3 does not represent an automaton state.
c    -( b^{29, 16}_2 ∧  b^{29, 16}_1 ∧  b^{29, 16}_0 ∧ true) 
c  in CNF:
c    -b^{29, 16}_2 ∨ -b^{29, 16}_1 ∨ -b^{29, 16}_0 ∨ false 
c  in DIMACS:
-14939 -14940 -14941  0

c i = 17
c  -2+1 --> -1
c    ( b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧  p_493) -> ( b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0)
c  in CNF:
c    -b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨  b^{29, 18}_2
c    -b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_1
c    -b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨  b^{29, 18}_0
c  in DIMACS:
-14942 -14943  14944 -493  14945 0
-14942 -14943  14944 -493 -14946 0
-14942 -14943  14944 -493  14947 0

c  -1+1 --> 0
c    ( b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0 ∧  p_493) -> (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧ -b^{29, 18}_0)
c  in CNF:
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_2
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_1
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_0
c  in DIMACS:
-14942  14943 -14944 -493 -14945 0
-14942  14943 -14944 -493 -14946 0
-14942  14943 -14944 -493 -14947 0

c  0+1 --> 1
c    (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧  p_493) -> (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0)
c  in CNF:
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_2
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_1
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨  b^{29, 18}_0
c  in DIMACS:
 14942  14943  14944 -493 -14945 0
 14942  14943  14944 -493 -14946 0
 14942  14943  14944 -493  14947 0

c  1+1 --> 2
c    (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0 ∧  p_493) -> (-b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0)
c  in CNF:
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_2
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨  b^{29, 18}_1
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ -p_493 ∨ -b^{29, 18}_0
c  in DIMACS:
 14942  14943 -14944 -493 -14945 0
 14942  14943 -14944 -493  14946 0
 14942  14943 -14944 -493 -14947 0

c  2+1 --> break 
c    (-b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧  p_493) -> break
c  in CNF:
c     b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ -p_493 ∨ break
c  in DIMACS:
 14942 -14943  14944 -493 1162 0


c  2-1 --> 1
c    (-b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧ -p_493) -> (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0)
c  in CNF:
c     b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_2
c     b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_1
c     b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨  b^{29, 18}_0
c  in DIMACS:
 14942 -14943  14944  493 -14945 0
 14942 -14943  14944  493 -14946 0
 14942 -14943  14944  493  14947 0

c  1-1 --> 0
c    (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0 ∧ -p_493) -> (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧ -b^{29, 18}_0)
c  in CNF:
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_2
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_1
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_0
c  in DIMACS:
 14942  14943 -14944  493 -14945 0
 14942  14943 -14944  493 -14946 0
 14942  14943 -14944  493 -14947 0

c  0-1 --> -1
c    (-b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧ -p_493) -> ( b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0)
c  in CNF:
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨  b^{29, 18}_2
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_1
c     b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨  b^{29, 18}_0
c  in DIMACS:
 14942  14943  14944  493  14945 0
 14942  14943  14944  493 -14946 0
 14942  14943  14944  493  14947 0

c  -1-1 --> -2
c    ( b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧  b^{29, 17}_0 ∧ -p_493) -> ( b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0)
c  in CNF:
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨  b^{29, 18}_2
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨  b^{29, 18}_1
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨  p_493 ∨ -b^{29, 18}_0
c  in DIMACS:
-14942  14943 -14944  493  14945 0
-14942  14943 -14944  493  14946 0
-14942  14943 -14944  493 -14947 0

c  -2-1 --> break 
c    ( b^{29, 17}_2 ∧  b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧ -p_493) -> break
c  in CNF:
c    -b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨  b^{29, 17}_0 ∨  p_493 ∨ break
c  in DIMACS:
-14942 -14943  14944  493 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 17}_2 ∧ -b^{29, 17}_1 ∧ -b^{29, 17}_0 ∧ true) 
c  in CNF:
c    -b^{29, 17}_2 ∨  b^{29, 17}_1 ∨  b^{29, 17}_0 ∨ false 
c  in DIMACS:
-14942  14943  14944  0

c  3 does not represent an automaton state.
c    -(-b^{29, 17}_2 ∧  b^{29, 17}_1 ∧  b^{29, 17}_0 ∧ true) 
c  in CNF:
c     b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ false 
c  in DIMACS:
 14942 -14943 -14944  0
c  -3 does not represent an automaton state.
c    -( b^{29, 17}_2 ∧  b^{29, 17}_1 ∧  b^{29, 17}_0 ∧ true) 
c  in CNF:
c    -b^{29, 17}_2 ∨ -b^{29, 17}_1 ∨ -b^{29, 17}_0 ∨ false 
c  in DIMACS:
-14942 -14943 -14944  0

c i = 18
c  -2+1 --> -1
c    ( b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧  p_522) -> ( b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0)
c  in CNF:
c    -b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨  b^{29, 19}_2
c    -b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_1
c    -b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨  b^{29, 19}_0
c  in DIMACS:
-14945 -14946  14947 -522  14948 0
-14945 -14946  14947 -522 -14949 0
-14945 -14946  14947 -522  14950 0

c  -1+1 --> 0
c    ( b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0 ∧  p_522) -> (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧ -b^{29, 19}_0)
c  in CNF:
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_2
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_1
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_0
c  in DIMACS:
-14945  14946 -14947 -522 -14948 0
-14945  14946 -14947 -522 -14949 0
-14945  14946 -14947 -522 -14950 0

c  0+1 --> 1
c    (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧  p_522) -> (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0)
c  in CNF:
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_2
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_1
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨  b^{29, 19}_0
c  in DIMACS:
 14945  14946  14947 -522 -14948 0
 14945  14946  14947 -522 -14949 0
 14945  14946  14947 -522  14950 0

c  1+1 --> 2
c    (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0 ∧  p_522) -> (-b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0)
c  in CNF:
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_2
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨  b^{29, 19}_1
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ -p_522 ∨ -b^{29, 19}_0
c  in DIMACS:
 14945  14946 -14947 -522 -14948 0
 14945  14946 -14947 -522  14949 0
 14945  14946 -14947 -522 -14950 0

c  2+1 --> break 
c    (-b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧  p_522) -> break
c  in CNF:
c     b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 14945 -14946  14947 -522 1162 0


c  2-1 --> 1
c    (-b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧ -p_522) -> (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0)
c  in CNF:
c     b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_2
c     b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_1
c     b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨  b^{29, 19}_0
c  in DIMACS:
 14945 -14946  14947  522 -14948 0
 14945 -14946  14947  522 -14949 0
 14945 -14946  14947  522  14950 0

c  1-1 --> 0
c    (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0 ∧ -p_522) -> (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧ -b^{29, 19}_0)
c  in CNF:
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_2
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_1
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_0
c  in DIMACS:
 14945  14946 -14947  522 -14948 0
 14945  14946 -14947  522 -14949 0
 14945  14946 -14947  522 -14950 0

c  0-1 --> -1
c    (-b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧ -p_522) -> ( b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0)
c  in CNF:
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨  b^{29, 19}_2
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_1
c     b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨  b^{29, 19}_0
c  in DIMACS:
 14945  14946  14947  522  14948 0
 14945  14946  14947  522 -14949 0
 14945  14946  14947  522  14950 0

c  -1-1 --> -2
c    ( b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧  b^{29, 18}_0 ∧ -p_522) -> ( b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0)
c  in CNF:
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨  b^{29, 19}_2
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨  b^{29, 19}_1
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨  p_522 ∨ -b^{29, 19}_0
c  in DIMACS:
-14945  14946 -14947  522  14948 0
-14945  14946 -14947  522  14949 0
-14945  14946 -14947  522 -14950 0

c  -2-1 --> break 
c    ( b^{29, 18}_2 ∧  b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨  b^{29, 18}_0 ∨  p_522 ∨ break
c  in DIMACS:
-14945 -14946  14947  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 18}_2 ∧ -b^{29, 18}_1 ∧ -b^{29, 18}_0 ∧ true) 
c  in CNF:
c    -b^{29, 18}_2 ∨  b^{29, 18}_1 ∨  b^{29, 18}_0 ∨ false 
c  in DIMACS:
-14945  14946  14947  0

c  3 does not represent an automaton state.
c    -(-b^{29, 18}_2 ∧  b^{29, 18}_1 ∧  b^{29, 18}_0 ∧ true) 
c  in CNF:
c     b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ false 
c  in DIMACS:
 14945 -14946 -14947  0
c  -3 does not represent an automaton state.
c    -( b^{29, 18}_2 ∧  b^{29, 18}_1 ∧  b^{29, 18}_0 ∧ true) 
c  in CNF:
c    -b^{29, 18}_2 ∨ -b^{29, 18}_1 ∨ -b^{29, 18}_0 ∨ false 
c  in DIMACS:
-14945 -14946 -14947  0

c i = 19
c  -2+1 --> -1
c    ( b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧  p_551) -> ( b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0)
c  in CNF:
c    -b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨  b^{29, 20}_2
c    -b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_1
c    -b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨  b^{29, 20}_0
c  in DIMACS:
-14948 -14949  14950 -551  14951 0
-14948 -14949  14950 -551 -14952 0
-14948 -14949  14950 -551  14953 0

c  -1+1 --> 0
c    ( b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0 ∧  p_551) -> (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧ -b^{29, 20}_0)
c  in CNF:
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_2
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_1
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_0
c  in DIMACS:
-14948  14949 -14950 -551 -14951 0
-14948  14949 -14950 -551 -14952 0
-14948  14949 -14950 -551 -14953 0

c  0+1 --> 1
c    (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧  p_551) -> (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0)
c  in CNF:
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_2
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_1
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨  b^{29, 20}_0
c  in DIMACS:
 14948  14949  14950 -551 -14951 0
 14948  14949  14950 -551 -14952 0
 14948  14949  14950 -551  14953 0

c  1+1 --> 2
c    (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0 ∧  p_551) -> (-b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0)
c  in CNF:
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_2
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨  b^{29, 20}_1
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ -p_551 ∨ -b^{29, 20}_0
c  in DIMACS:
 14948  14949 -14950 -551 -14951 0
 14948  14949 -14950 -551  14952 0
 14948  14949 -14950 -551 -14953 0

c  2+1 --> break 
c    (-b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧  p_551) -> break
c  in CNF:
c     b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ -p_551 ∨ break
c  in DIMACS:
 14948 -14949  14950 -551 1162 0


c  2-1 --> 1
c    (-b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧ -p_551) -> (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0)
c  in CNF:
c     b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_2
c     b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_1
c     b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨  b^{29, 20}_0
c  in DIMACS:
 14948 -14949  14950  551 -14951 0
 14948 -14949  14950  551 -14952 0
 14948 -14949  14950  551  14953 0

c  1-1 --> 0
c    (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0 ∧ -p_551) -> (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧ -b^{29, 20}_0)
c  in CNF:
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_2
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_1
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_0
c  in DIMACS:
 14948  14949 -14950  551 -14951 0
 14948  14949 -14950  551 -14952 0
 14948  14949 -14950  551 -14953 0

c  0-1 --> -1
c    (-b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧ -p_551) -> ( b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0)
c  in CNF:
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨  b^{29, 20}_2
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_1
c     b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨  b^{29, 20}_0
c  in DIMACS:
 14948  14949  14950  551  14951 0
 14948  14949  14950  551 -14952 0
 14948  14949  14950  551  14953 0

c  -1-1 --> -2
c    ( b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧  b^{29, 19}_0 ∧ -p_551) -> ( b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0)
c  in CNF:
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨  b^{29, 20}_2
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨  b^{29, 20}_1
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨  p_551 ∨ -b^{29, 20}_0
c  in DIMACS:
-14948  14949 -14950  551  14951 0
-14948  14949 -14950  551  14952 0
-14948  14949 -14950  551 -14953 0

c  -2-1 --> break 
c    ( b^{29, 19}_2 ∧  b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧ -p_551) -> break
c  in CNF:
c    -b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨  b^{29, 19}_0 ∨  p_551 ∨ break
c  in DIMACS:
-14948 -14949  14950  551 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 19}_2 ∧ -b^{29, 19}_1 ∧ -b^{29, 19}_0 ∧ true) 
c  in CNF:
c    -b^{29, 19}_2 ∨  b^{29, 19}_1 ∨  b^{29, 19}_0 ∨ false 
c  in DIMACS:
-14948  14949  14950  0

c  3 does not represent an automaton state.
c    -(-b^{29, 19}_2 ∧  b^{29, 19}_1 ∧  b^{29, 19}_0 ∧ true) 
c  in CNF:
c     b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ false 
c  in DIMACS:
 14948 -14949 -14950  0
c  -3 does not represent an automaton state.
c    -( b^{29, 19}_2 ∧  b^{29, 19}_1 ∧  b^{29, 19}_0 ∧ true) 
c  in CNF:
c    -b^{29, 19}_2 ∨ -b^{29, 19}_1 ∨ -b^{29, 19}_0 ∨ false 
c  in DIMACS:
-14948 -14949 -14950  0

c i = 20
c  -2+1 --> -1
c    ( b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧  p_580) -> ( b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0)
c  in CNF:
c    -b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨  b^{29, 21}_2
c    -b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_1
c    -b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨  b^{29, 21}_0
c  in DIMACS:
-14951 -14952  14953 -580  14954 0
-14951 -14952  14953 -580 -14955 0
-14951 -14952  14953 -580  14956 0

c  -1+1 --> 0
c    ( b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0 ∧  p_580) -> (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧ -b^{29, 21}_0)
c  in CNF:
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_2
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_1
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_0
c  in DIMACS:
-14951  14952 -14953 -580 -14954 0
-14951  14952 -14953 -580 -14955 0
-14951  14952 -14953 -580 -14956 0

c  0+1 --> 1
c    (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧  p_580) -> (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0)
c  in CNF:
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_2
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_1
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨  b^{29, 21}_0
c  in DIMACS:
 14951  14952  14953 -580 -14954 0
 14951  14952  14953 -580 -14955 0
 14951  14952  14953 -580  14956 0

c  1+1 --> 2
c    (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0 ∧  p_580) -> (-b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0)
c  in CNF:
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_2
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨  b^{29, 21}_1
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ -p_580 ∨ -b^{29, 21}_0
c  in DIMACS:
 14951  14952 -14953 -580 -14954 0
 14951  14952 -14953 -580  14955 0
 14951  14952 -14953 -580 -14956 0

c  2+1 --> break 
c    (-b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧  p_580) -> break
c  in CNF:
c     b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 14951 -14952  14953 -580 1162 0


c  2-1 --> 1
c    (-b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧ -p_580) -> (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0)
c  in CNF:
c     b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_2
c     b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_1
c     b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨  b^{29, 21}_0
c  in DIMACS:
 14951 -14952  14953  580 -14954 0
 14951 -14952  14953  580 -14955 0
 14951 -14952  14953  580  14956 0

c  1-1 --> 0
c    (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0 ∧ -p_580) -> (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧ -b^{29, 21}_0)
c  in CNF:
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_2
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_1
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_0
c  in DIMACS:
 14951  14952 -14953  580 -14954 0
 14951  14952 -14953  580 -14955 0
 14951  14952 -14953  580 -14956 0

c  0-1 --> -1
c    (-b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧ -p_580) -> ( b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0)
c  in CNF:
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨  b^{29, 21}_2
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_1
c     b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨  b^{29, 21}_0
c  in DIMACS:
 14951  14952  14953  580  14954 0
 14951  14952  14953  580 -14955 0
 14951  14952  14953  580  14956 0

c  -1-1 --> -2
c    ( b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧  b^{29, 20}_0 ∧ -p_580) -> ( b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0)
c  in CNF:
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨  b^{29, 21}_2
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨  b^{29, 21}_1
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨  p_580 ∨ -b^{29, 21}_0
c  in DIMACS:
-14951  14952 -14953  580  14954 0
-14951  14952 -14953  580  14955 0
-14951  14952 -14953  580 -14956 0

c  -2-1 --> break 
c    ( b^{29, 20}_2 ∧  b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨  b^{29, 20}_0 ∨  p_580 ∨ break
c  in DIMACS:
-14951 -14952  14953  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 20}_2 ∧ -b^{29, 20}_1 ∧ -b^{29, 20}_0 ∧ true) 
c  in CNF:
c    -b^{29, 20}_2 ∨  b^{29, 20}_1 ∨  b^{29, 20}_0 ∨ false 
c  in DIMACS:
-14951  14952  14953  0

c  3 does not represent an automaton state.
c    -(-b^{29, 20}_2 ∧  b^{29, 20}_1 ∧  b^{29, 20}_0 ∧ true) 
c  in CNF:
c     b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ false 
c  in DIMACS:
 14951 -14952 -14953  0
c  -3 does not represent an automaton state.
c    -( b^{29, 20}_2 ∧  b^{29, 20}_1 ∧  b^{29, 20}_0 ∧ true) 
c  in CNF:
c    -b^{29, 20}_2 ∨ -b^{29, 20}_1 ∨ -b^{29, 20}_0 ∨ false 
c  in DIMACS:
-14951 -14952 -14953  0

c i = 21
c  -2+1 --> -1
c    ( b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧  p_609) -> ( b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0)
c  in CNF:
c    -b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨  b^{29, 22}_2
c    -b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_1
c    -b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨  b^{29, 22}_0
c  in DIMACS:
-14954 -14955  14956 -609  14957 0
-14954 -14955  14956 -609 -14958 0
-14954 -14955  14956 -609  14959 0

c  -1+1 --> 0
c    ( b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0 ∧  p_609) -> (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧ -b^{29, 22}_0)
c  in CNF:
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_2
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_1
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_0
c  in DIMACS:
-14954  14955 -14956 -609 -14957 0
-14954  14955 -14956 -609 -14958 0
-14954  14955 -14956 -609 -14959 0

c  0+1 --> 1
c    (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧  p_609) -> (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0)
c  in CNF:
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_2
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_1
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨  b^{29, 22}_0
c  in DIMACS:
 14954  14955  14956 -609 -14957 0
 14954  14955  14956 -609 -14958 0
 14954  14955  14956 -609  14959 0

c  1+1 --> 2
c    (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0 ∧  p_609) -> (-b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0)
c  in CNF:
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_2
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨  b^{29, 22}_1
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ -p_609 ∨ -b^{29, 22}_0
c  in DIMACS:
 14954  14955 -14956 -609 -14957 0
 14954  14955 -14956 -609  14958 0
 14954  14955 -14956 -609 -14959 0

c  2+1 --> break 
c    (-b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧  p_609) -> break
c  in CNF:
c     b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 14954 -14955  14956 -609 1162 0


c  2-1 --> 1
c    (-b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧ -p_609) -> (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0)
c  in CNF:
c     b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_2
c     b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_1
c     b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨  b^{29, 22}_0
c  in DIMACS:
 14954 -14955  14956  609 -14957 0
 14954 -14955  14956  609 -14958 0
 14954 -14955  14956  609  14959 0

c  1-1 --> 0
c    (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0 ∧ -p_609) -> (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧ -b^{29, 22}_0)
c  in CNF:
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_2
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_1
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_0
c  in DIMACS:
 14954  14955 -14956  609 -14957 0
 14954  14955 -14956  609 -14958 0
 14954  14955 -14956  609 -14959 0

c  0-1 --> -1
c    (-b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧ -p_609) -> ( b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0)
c  in CNF:
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨  b^{29, 22}_2
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_1
c     b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨  b^{29, 22}_0
c  in DIMACS:
 14954  14955  14956  609  14957 0
 14954  14955  14956  609 -14958 0
 14954  14955  14956  609  14959 0

c  -1-1 --> -2
c    ( b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧  b^{29, 21}_0 ∧ -p_609) -> ( b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0)
c  in CNF:
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨  b^{29, 22}_2
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨  b^{29, 22}_1
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨  p_609 ∨ -b^{29, 22}_0
c  in DIMACS:
-14954  14955 -14956  609  14957 0
-14954  14955 -14956  609  14958 0
-14954  14955 -14956  609 -14959 0

c  -2-1 --> break 
c    ( b^{29, 21}_2 ∧  b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨  b^{29, 21}_0 ∨  p_609 ∨ break
c  in DIMACS:
-14954 -14955  14956  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 21}_2 ∧ -b^{29, 21}_1 ∧ -b^{29, 21}_0 ∧ true) 
c  in CNF:
c    -b^{29, 21}_2 ∨  b^{29, 21}_1 ∨  b^{29, 21}_0 ∨ false 
c  in DIMACS:
-14954  14955  14956  0

c  3 does not represent an automaton state.
c    -(-b^{29, 21}_2 ∧  b^{29, 21}_1 ∧  b^{29, 21}_0 ∧ true) 
c  in CNF:
c     b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ false 
c  in DIMACS:
 14954 -14955 -14956  0
c  -3 does not represent an automaton state.
c    -( b^{29, 21}_2 ∧  b^{29, 21}_1 ∧  b^{29, 21}_0 ∧ true) 
c  in CNF:
c    -b^{29, 21}_2 ∨ -b^{29, 21}_1 ∨ -b^{29, 21}_0 ∨ false 
c  in DIMACS:
-14954 -14955 -14956  0

c i = 22
c  -2+1 --> -1
c    ( b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧  p_638) -> ( b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0)
c  in CNF:
c    -b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨  b^{29, 23}_2
c    -b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_1
c    -b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨  b^{29, 23}_0
c  in DIMACS:
-14957 -14958  14959 -638  14960 0
-14957 -14958  14959 -638 -14961 0
-14957 -14958  14959 -638  14962 0

c  -1+1 --> 0
c    ( b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0 ∧  p_638) -> (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧ -b^{29, 23}_0)
c  in CNF:
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_2
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_1
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_0
c  in DIMACS:
-14957  14958 -14959 -638 -14960 0
-14957  14958 -14959 -638 -14961 0
-14957  14958 -14959 -638 -14962 0

c  0+1 --> 1
c    (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧  p_638) -> (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0)
c  in CNF:
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_2
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_1
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨  b^{29, 23}_0
c  in DIMACS:
 14957  14958  14959 -638 -14960 0
 14957  14958  14959 -638 -14961 0
 14957  14958  14959 -638  14962 0

c  1+1 --> 2
c    (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0 ∧  p_638) -> (-b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0)
c  in CNF:
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_2
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨  b^{29, 23}_1
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ -p_638 ∨ -b^{29, 23}_0
c  in DIMACS:
 14957  14958 -14959 -638 -14960 0
 14957  14958 -14959 -638  14961 0
 14957  14958 -14959 -638 -14962 0

c  2+1 --> break 
c    (-b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧  p_638) -> break
c  in CNF:
c     b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 14957 -14958  14959 -638 1162 0


c  2-1 --> 1
c    (-b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧ -p_638) -> (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0)
c  in CNF:
c     b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_2
c     b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_1
c     b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨  b^{29, 23}_0
c  in DIMACS:
 14957 -14958  14959  638 -14960 0
 14957 -14958  14959  638 -14961 0
 14957 -14958  14959  638  14962 0

c  1-1 --> 0
c    (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0 ∧ -p_638) -> (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧ -b^{29, 23}_0)
c  in CNF:
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_2
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_1
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_0
c  in DIMACS:
 14957  14958 -14959  638 -14960 0
 14957  14958 -14959  638 -14961 0
 14957  14958 -14959  638 -14962 0

c  0-1 --> -1
c    (-b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧ -p_638) -> ( b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0)
c  in CNF:
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨  b^{29, 23}_2
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_1
c     b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨  b^{29, 23}_0
c  in DIMACS:
 14957  14958  14959  638  14960 0
 14957  14958  14959  638 -14961 0
 14957  14958  14959  638  14962 0

c  -1-1 --> -2
c    ( b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧  b^{29, 22}_0 ∧ -p_638) -> ( b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0)
c  in CNF:
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨  b^{29, 23}_2
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨  b^{29, 23}_1
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨  p_638 ∨ -b^{29, 23}_0
c  in DIMACS:
-14957  14958 -14959  638  14960 0
-14957  14958 -14959  638  14961 0
-14957  14958 -14959  638 -14962 0

c  -2-1 --> break 
c    ( b^{29, 22}_2 ∧  b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨  b^{29, 22}_0 ∨  p_638 ∨ break
c  in DIMACS:
-14957 -14958  14959  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 22}_2 ∧ -b^{29, 22}_1 ∧ -b^{29, 22}_0 ∧ true) 
c  in CNF:
c    -b^{29, 22}_2 ∨  b^{29, 22}_1 ∨  b^{29, 22}_0 ∨ false 
c  in DIMACS:
-14957  14958  14959  0

c  3 does not represent an automaton state.
c    -(-b^{29, 22}_2 ∧  b^{29, 22}_1 ∧  b^{29, 22}_0 ∧ true) 
c  in CNF:
c     b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ false 
c  in DIMACS:
 14957 -14958 -14959  0
c  -3 does not represent an automaton state.
c    -( b^{29, 22}_2 ∧  b^{29, 22}_1 ∧  b^{29, 22}_0 ∧ true) 
c  in CNF:
c    -b^{29, 22}_2 ∨ -b^{29, 22}_1 ∨ -b^{29, 22}_0 ∨ false 
c  in DIMACS:
-14957 -14958 -14959  0

c i = 23
c  -2+1 --> -1
c    ( b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧  p_667) -> ( b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0)
c  in CNF:
c    -b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨  b^{29, 24}_2
c    -b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_1
c    -b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨  b^{29, 24}_0
c  in DIMACS:
-14960 -14961  14962 -667  14963 0
-14960 -14961  14962 -667 -14964 0
-14960 -14961  14962 -667  14965 0

c  -1+1 --> 0
c    ( b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0 ∧  p_667) -> (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧ -b^{29, 24}_0)
c  in CNF:
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_2
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_1
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_0
c  in DIMACS:
-14960  14961 -14962 -667 -14963 0
-14960  14961 -14962 -667 -14964 0
-14960  14961 -14962 -667 -14965 0

c  0+1 --> 1
c    (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧  p_667) -> (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0)
c  in CNF:
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_2
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_1
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨  b^{29, 24}_0
c  in DIMACS:
 14960  14961  14962 -667 -14963 0
 14960  14961  14962 -667 -14964 0
 14960  14961  14962 -667  14965 0

c  1+1 --> 2
c    (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0 ∧  p_667) -> (-b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0)
c  in CNF:
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_2
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨  b^{29, 24}_1
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ -p_667 ∨ -b^{29, 24}_0
c  in DIMACS:
 14960  14961 -14962 -667 -14963 0
 14960  14961 -14962 -667  14964 0
 14960  14961 -14962 -667 -14965 0

c  2+1 --> break 
c    (-b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧  p_667) -> break
c  in CNF:
c     b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ -p_667 ∨ break
c  in DIMACS:
 14960 -14961  14962 -667 1162 0


c  2-1 --> 1
c    (-b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧ -p_667) -> (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0)
c  in CNF:
c     b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_2
c     b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_1
c     b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨  b^{29, 24}_0
c  in DIMACS:
 14960 -14961  14962  667 -14963 0
 14960 -14961  14962  667 -14964 0
 14960 -14961  14962  667  14965 0

c  1-1 --> 0
c    (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0 ∧ -p_667) -> (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧ -b^{29, 24}_0)
c  in CNF:
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_2
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_1
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_0
c  in DIMACS:
 14960  14961 -14962  667 -14963 0
 14960  14961 -14962  667 -14964 0
 14960  14961 -14962  667 -14965 0

c  0-1 --> -1
c    (-b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧ -p_667) -> ( b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0)
c  in CNF:
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨  b^{29, 24}_2
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_1
c     b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨  b^{29, 24}_0
c  in DIMACS:
 14960  14961  14962  667  14963 0
 14960  14961  14962  667 -14964 0
 14960  14961  14962  667  14965 0

c  -1-1 --> -2
c    ( b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧  b^{29, 23}_0 ∧ -p_667) -> ( b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0)
c  in CNF:
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨  b^{29, 24}_2
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨  b^{29, 24}_1
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨  p_667 ∨ -b^{29, 24}_0
c  in DIMACS:
-14960  14961 -14962  667  14963 0
-14960  14961 -14962  667  14964 0
-14960  14961 -14962  667 -14965 0

c  -2-1 --> break 
c    ( b^{29, 23}_2 ∧  b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧ -p_667) -> break
c  in CNF:
c    -b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨  b^{29, 23}_0 ∨  p_667 ∨ break
c  in DIMACS:
-14960 -14961  14962  667 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 23}_2 ∧ -b^{29, 23}_1 ∧ -b^{29, 23}_0 ∧ true) 
c  in CNF:
c    -b^{29, 23}_2 ∨  b^{29, 23}_1 ∨  b^{29, 23}_0 ∨ false 
c  in DIMACS:
-14960  14961  14962  0

c  3 does not represent an automaton state.
c    -(-b^{29, 23}_2 ∧  b^{29, 23}_1 ∧  b^{29, 23}_0 ∧ true) 
c  in CNF:
c     b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ false 
c  in DIMACS:
 14960 -14961 -14962  0
c  -3 does not represent an automaton state.
c    -( b^{29, 23}_2 ∧  b^{29, 23}_1 ∧  b^{29, 23}_0 ∧ true) 
c  in CNF:
c    -b^{29, 23}_2 ∨ -b^{29, 23}_1 ∨ -b^{29, 23}_0 ∨ false 
c  in DIMACS:
-14960 -14961 -14962  0

c i = 24
c  -2+1 --> -1
c    ( b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧  p_696) -> ( b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0)
c  in CNF:
c    -b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨  b^{29, 25}_2
c    -b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_1
c    -b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨  b^{29, 25}_0
c  in DIMACS:
-14963 -14964  14965 -696  14966 0
-14963 -14964  14965 -696 -14967 0
-14963 -14964  14965 -696  14968 0

c  -1+1 --> 0
c    ( b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0 ∧  p_696) -> (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧ -b^{29, 25}_0)
c  in CNF:
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_2
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_1
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_0
c  in DIMACS:
-14963  14964 -14965 -696 -14966 0
-14963  14964 -14965 -696 -14967 0
-14963  14964 -14965 -696 -14968 0

c  0+1 --> 1
c    (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧  p_696) -> (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0)
c  in CNF:
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_2
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_1
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨  b^{29, 25}_0
c  in DIMACS:
 14963  14964  14965 -696 -14966 0
 14963  14964  14965 -696 -14967 0
 14963  14964  14965 -696  14968 0

c  1+1 --> 2
c    (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0 ∧  p_696) -> (-b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0)
c  in CNF:
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_2
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨  b^{29, 25}_1
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ -p_696 ∨ -b^{29, 25}_0
c  in DIMACS:
 14963  14964 -14965 -696 -14966 0
 14963  14964 -14965 -696  14967 0
 14963  14964 -14965 -696 -14968 0

c  2+1 --> break 
c    (-b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧  p_696) -> break
c  in CNF:
c     b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 14963 -14964  14965 -696 1162 0


c  2-1 --> 1
c    (-b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧ -p_696) -> (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0)
c  in CNF:
c     b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_2
c     b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_1
c     b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨  b^{29, 25}_0
c  in DIMACS:
 14963 -14964  14965  696 -14966 0
 14963 -14964  14965  696 -14967 0
 14963 -14964  14965  696  14968 0

c  1-1 --> 0
c    (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0 ∧ -p_696) -> (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧ -b^{29, 25}_0)
c  in CNF:
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_2
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_1
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_0
c  in DIMACS:
 14963  14964 -14965  696 -14966 0
 14963  14964 -14965  696 -14967 0
 14963  14964 -14965  696 -14968 0

c  0-1 --> -1
c    (-b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧ -p_696) -> ( b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0)
c  in CNF:
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨  b^{29, 25}_2
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_1
c     b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨  b^{29, 25}_0
c  in DIMACS:
 14963  14964  14965  696  14966 0
 14963  14964  14965  696 -14967 0
 14963  14964  14965  696  14968 0

c  -1-1 --> -2
c    ( b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧  b^{29, 24}_0 ∧ -p_696) -> ( b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0)
c  in CNF:
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨  b^{29, 25}_2
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨  b^{29, 25}_1
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨  p_696 ∨ -b^{29, 25}_0
c  in DIMACS:
-14963  14964 -14965  696  14966 0
-14963  14964 -14965  696  14967 0
-14963  14964 -14965  696 -14968 0

c  -2-1 --> break 
c    ( b^{29, 24}_2 ∧  b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨  b^{29, 24}_0 ∨  p_696 ∨ break
c  in DIMACS:
-14963 -14964  14965  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 24}_2 ∧ -b^{29, 24}_1 ∧ -b^{29, 24}_0 ∧ true) 
c  in CNF:
c    -b^{29, 24}_2 ∨  b^{29, 24}_1 ∨  b^{29, 24}_0 ∨ false 
c  in DIMACS:
-14963  14964  14965  0

c  3 does not represent an automaton state.
c    -(-b^{29, 24}_2 ∧  b^{29, 24}_1 ∧  b^{29, 24}_0 ∧ true) 
c  in CNF:
c     b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ false 
c  in DIMACS:
 14963 -14964 -14965  0
c  -3 does not represent an automaton state.
c    -( b^{29, 24}_2 ∧  b^{29, 24}_1 ∧  b^{29, 24}_0 ∧ true) 
c  in CNF:
c    -b^{29, 24}_2 ∨ -b^{29, 24}_1 ∨ -b^{29, 24}_0 ∨ false 
c  in DIMACS:
-14963 -14964 -14965  0

c i = 25
c  -2+1 --> -1
c    ( b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧  p_725) -> ( b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0)
c  in CNF:
c    -b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨  b^{29, 26}_2
c    -b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_1
c    -b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨  b^{29, 26}_0
c  in DIMACS:
-14966 -14967  14968 -725  14969 0
-14966 -14967  14968 -725 -14970 0
-14966 -14967  14968 -725  14971 0

c  -1+1 --> 0
c    ( b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0 ∧  p_725) -> (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧ -b^{29, 26}_0)
c  in CNF:
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_2
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_1
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_0
c  in DIMACS:
-14966  14967 -14968 -725 -14969 0
-14966  14967 -14968 -725 -14970 0
-14966  14967 -14968 -725 -14971 0

c  0+1 --> 1
c    (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧  p_725) -> (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0)
c  in CNF:
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_2
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_1
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨  b^{29, 26}_0
c  in DIMACS:
 14966  14967  14968 -725 -14969 0
 14966  14967  14968 -725 -14970 0
 14966  14967  14968 -725  14971 0

c  1+1 --> 2
c    (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0 ∧  p_725) -> (-b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0)
c  in CNF:
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_2
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨  b^{29, 26}_1
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ -p_725 ∨ -b^{29, 26}_0
c  in DIMACS:
 14966  14967 -14968 -725 -14969 0
 14966  14967 -14968 -725  14970 0
 14966  14967 -14968 -725 -14971 0

c  2+1 --> break 
c    (-b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧  p_725) -> break
c  in CNF:
c     b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ -p_725 ∨ break
c  in DIMACS:
 14966 -14967  14968 -725 1162 0


c  2-1 --> 1
c    (-b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧ -p_725) -> (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0)
c  in CNF:
c     b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_2
c     b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_1
c     b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨  b^{29, 26}_0
c  in DIMACS:
 14966 -14967  14968  725 -14969 0
 14966 -14967  14968  725 -14970 0
 14966 -14967  14968  725  14971 0

c  1-1 --> 0
c    (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0 ∧ -p_725) -> (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧ -b^{29, 26}_0)
c  in CNF:
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_2
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_1
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_0
c  in DIMACS:
 14966  14967 -14968  725 -14969 0
 14966  14967 -14968  725 -14970 0
 14966  14967 -14968  725 -14971 0

c  0-1 --> -1
c    (-b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧ -p_725) -> ( b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0)
c  in CNF:
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨  b^{29, 26}_2
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_1
c     b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨  b^{29, 26}_0
c  in DIMACS:
 14966  14967  14968  725  14969 0
 14966  14967  14968  725 -14970 0
 14966  14967  14968  725  14971 0

c  -1-1 --> -2
c    ( b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧  b^{29, 25}_0 ∧ -p_725) -> ( b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0)
c  in CNF:
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨  b^{29, 26}_2
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨  b^{29, 26}_1
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨  p_725 ∨ -b^{29, 26}_0
c  in DIMACS:
-14966  14967 -14968  725  14969 0
-14966  14967 -14968  725  14970 0
-14966  14967 -14968  725 -14971 0

c  -2-1 --> break 
c    ( b^{29, 25}_2 ∧  b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧ -p_725) -> break
c  in CNF:
c    -b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨  b^{29, 25}_0 ∨  p_725 ∨ break
c  in DIMACS:
-14966 -14967  14968  725 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 25}_2 ∧ -b^{29, 25}_1 ∧ -b^{29, 25}_0 ∧ true) 
c  in CNF:
c    -b^{29, 25}_2 ∨  b^{29, 25}_1 ∨  b^{29, 25}_0 ∨ false 
c  in DIMACS:
-14966  14967  14968  0

c  3 does not represent an automaton state.
c    -(-b^{29, 25}_2 ∧  b^{29, 25}_1 ∧  b^{29, 25}_0 ∧ true) 
c  in CNF:
c     b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ false 
c  in DIMACS:
 14966 -14967 -14968  0
c  -3 does not represent an automaton state.
c    -( b^{29, 25}_2 ∧  b^{29, 25}_1 ∧  b^{29, 25}_0 ∧ true) 
c  in CNF:
c    -b^{29, 25}_2 ∨ -b^{29, 25}_1 ∨ -b^{29, 25}_0 ∨ false 
c  in DIMACS:
-14966 -14967 -14968  0

c i = 26
c  -2+1 --> -1
c    ( b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧  p_754) -> ( b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0)
c  in CNF:
c    -b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨  b^{29, 27}_2
c    -b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_1
c    -b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨  b^{29, 27}_0
c  in DIMACS:
-14969 -14970  14971 -754  14972 0
-14969 -14970  14971 -754 -14973 0
-14969 -14970  14971 -754  14974 0

c  -1+1 --> 0
c    ( b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0 ∧  p_754) -> (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧ -b^{29, 27}_0)
c  in CNF:
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_2
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_1
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_0
c  in DIMACS:
-14969  14970 -14971 -754 -14972 0
-14969  14970 -14971 -754 -14973 0
-14969  14970 -14971 -754 -14974 0

c  0+1 --> 1
c    (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧  p_754) -> (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0)
c  in CNF:
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_2
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_1
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨  b^{29, 27}_0
c  in DIMACS:
 14969  14970  14971 -754 -14972 0
 14969  14970  14971 -754 -14973 0
 14969  14970  14971 -754  14974 0

c  1+1 --> 2
c    (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0 ∧  p_754) -> (-b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0)
c  in CNF:
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_2
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨  b^{29, 27}_1
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ -p_754 ∨ -b^{29, 27}_0
c  in DIMACS:
 14969  14970 -14971 -754 -14972 0
 14969  14970 -14971 -754  14973 0
 14969  14970 -14971 -754 -14974 0

c  2+1 --> break 
c    (-b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧  p_754) -> break
c  in CNF:
c     b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 14969 -14970  14971 -754 1162 0


c  2-1 --> 1
c    (-b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧ -p_754) -> (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0)
c  in CNF:
c     b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_2
c     b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_1
c     b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨  b^{29, 27}_0
c  in DIMACS:
 14969 -14970  14971  754 -14972 0
 14969 -14970  14971  754 -14973 0
 14969 -14970  14971  754  14974 0

c  1-1 --> 0
c    (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0 ∧ -p_754) -> (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧ -b^{29, 27}_0)
c  in CNF:
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_2
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_1
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_0
c  in DIMACS:
 14969  14970 -14971  754 -14972 0
 14969  14970 -14971  754 -14973 0
 14969  14970 -14971  754 -14974 0

c  0-1 --> -1
c    (-b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧ -p_754) -> ( b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0)
c  in CNF:
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨  b^{29, 27}_2
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_1
c     b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨  b^{29, 27}_0
c  in DIMACS:
 14969  14970  14971  754  14972 0
 14969  14970  14971  754 -14973 0
 14969  14970  14971  754  14974 0

c  -1-1 --> -2
c    ( b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧  b^{29, 26}_0 ∧ -p_754) -> ( b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0)
c  in CNF:
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨  b^{29, 27}_2
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨  b^{29, 27}_1
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨  p_754 ∨ -b^{29, 27}_0
c  in DIMACS:
-14969  14970 -14971  754  14972 0
-14969  14970 -14971  754  14973 0
-14969  14970 -14971  754 -14974 0

c  -2-1 --> break 
c    ( b^{29, 26}_2 ∧  b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨  b^{29, 26}_0 ∨  p_754 ∨ break
c  in DIMACS:
-14969 -14970  14971  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 26}_2 ∧ -b^{29, 26}_1 ∧ -b^{29, 26}_0 ∧ true) 
c  in CNF:
c    -b^{29, 26}_2 ∨  b^{29, 26}_1 ∨  b^{29, 26}_0 ∨ false 
c  in DIMACS:
-14969  14970  14971  0

c  3 does not represent an automaton state.
c    -(-b^{29, 26}_2 ∧  b^{29, 26}_1 ∧  b^{29, 26}_0 ∧ true) 
c  in CNF:
c     b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ false 
c  in DIMACS:
 14969 -14970 -14971  0
c  -3 does not represent an automaton state.
c    -( b^{29, 26}_2 ∧  b^{29, 26}_1 ∧  b^{29, 26}_0 ∧ true) 
c  in CNF:
c    -b^{29, 26}_2 ∨ -b^{29, 26}_1 ∨ -b^{29, 26}_0 ∨ false 
c  in DIMACS:
-14969 -14970 -14971  0

c i = 27
c  -2+1 --> -1
c    ( b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧  p_783) -> ( b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0)
c  in CNF:
c    -b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨  b^{29, 28}_2
c    -b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_1
c    -b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨  b^{29, 28}_0
c  in DIMACS:
-14972 -14973  14974 -783  14975 0
-14972 -14973  14974 -783 -14976 0
-14972 -14973  14974 -783  14977 0

c  -1+1 --> 0
c    ( b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0 ∧  p_783) -> (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧ -b^{29, 28}_0)
c  in CNF:
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_2
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_1
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_0
c  in DIMACS:
-14972  14973 -14974 -783 -14975 0
-14972  14973 -14974 -783 -14976 0
-14972  14973 -14974 -783 -14977 0

c  0+1 --> 1
c    (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧  p_783) -> (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0)
c  in CNF:
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_2
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_1
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨  b^{29, 28}_0
c  in DIMACS:
 14972  14973  14974 -783 -14975 0
 14972  14973  14974 -783 -14976 0
 14972  14973  14974 -783  14977 0

c  1+1 --> 2
c    (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0 ∧  p_783) -> (-b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0)
c  in CNF:
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_2
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨  b^{29, 28}_1
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ -p_783 ∨ -b^{29, 28}_0
c  in DIMACS:
 14972  14973 -14974 -783 -14975 0
 14972  14973 -14974 -783  14976 0
 14972  14973 -14974 -783 -14977 0

c  2+1 --> break 
c    (-b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧  p_783) -> break
c  in CNF:
c     b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 14972 -14973  14974 -783 1162 0


c  2-1 --> 1
c    (-b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧ -p_783) -> (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0)
c  in CNF:
c     b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_2
c     b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_1
c     b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨  b^{29, 28}_0
c  in DIMACS:
 14972 -14973  14974  783 -14975 0
 14972 -14973  14974  783 -14976 0
 14972 -14973  14974  783  14977 0

c  1-1 --> 0
c    (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0 ∧ -p_783) -> (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧ -b^{29, 28}_0)
c  in CNF:
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_2
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_1
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_0
c  in DIMACS:
 14972  14973 -14974  783 -14975 0
 14972  14973 -14974  783 -14976 0
 14972  14973 -14974  783 -14977 0

c  0-1 --> -1
c    (-b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧ -p_783) -> ( b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0)
c  in CNF:
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨  b^{29, 28}_2
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_1
c     b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨  b^{29, 28}_0
c  in DIMACS:
 14972  14973  14974  783  14975 0
 14972  14973  14974  783 -14976 0
 14972  14973  14974  783  14977 0

c  -1-1 --> -2
c    ( b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧  b^{29, 27}_0 ∧ -p_783) -> ( b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0)
c  in CNF:
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨  b^{29, 28}_2
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨  b^{29, 28}_1
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨  p_783 ∨ -b^{29, 28}_0
c  in DIMACS:
-14972  14973 -14974  783  14975 0
-14972  14973 -14974  783  14976 0
-14972  14973 -14974  783 -14977 0

c  -2-1 --> break 
c    ( b^{29, 27}_2 ∧  b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨  b^{29, 27}_0 ∨  p_783 ∨ break
c  in DIMACS:
-14972 -14973  14974  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 27}_2 ∧ -b^{29, 27}_1 ∧ -b^{29, 27}_0 ∧ true) 
c  in CNF:
c    -b^{29, 27}_2 ∨  b^{29, 27}_1 ∨  b^{29, 27}_0 ∨ false 
c  in DIMACS:
-14972  14973  14974  0

c  3 does not represent an automaton state.
c    -(-b^{29, 27}_2 ∧  b^{29, 27}_1 ∧  b^{29, 27}_0 ∧ true) 
c  in CNF:
c     b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ false 
c  in DIMACS:
 14972 -14973 -14974  0
c  -3 does not represent an automaton state.
c    -( b^{29, 27}_2 ∧  b^{29, 27}_1 ∧  b^{29, 27}_0 ∧ true) 
c  in CNF:
c    -b^{29, 27}_2 ∨ -b^{29, 27}_1 ∨ -b^{29, 27}_0 ∨ false 
c  in DIMACS:
-14972 -14973 -14974  0

c i = 28
c  -2+1 --> -1
c    ( b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧  p_812) -> ( b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0)
c  in CNF:
c    -b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨  b^{29, 29}_2
c    -b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_1
c    -b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨  b^{29, 29}_0
c  in DIMACS:
-14975 -14976  14977 -812  14978 0
-14975 -14976  14977 -812 -14979 0
-14975 -14976  14977 -812  14980 0

c  -1+1 --> 0
c    ( b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0 ∧  p_812) -> (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧ -b^{29, 29}_0)
c  in CNF:
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_2
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_1
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_0
c  in DIMACS:
-14975  14976 -14977 -812 -14978 0
-14975  14976 -14977 -812 -14979 0
-14975  14976 -14977 -812 -14980 0

c  0+1 --> 1
c    (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧  p_812) -> (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0)
c  in CNF:
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_2
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_1
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨  b^{29, 29}_0
c  in DIMACS:
 14975  14976  14977 -812 -14978 0
 14975  14976  14977 -812 -14979 0
 14975  14976  14977 -812  14980 0

c  1+1 --> 2
c    (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0 ∧  p_812) -> (-b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0)
c  in CNF:
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_2
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨  b^{29, 29}_1
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ -p_812 ∨ -b^{29, 29}_0
c  in DIMACS:
 14975  14976 -14977 -812 -14978 0
 14975  14976 -14977 -812  14979 0
 14975  14976 -14977 -812 -14980 0

c  2+1 --> break 
c    (-b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧  p_812) -> break
c  in CNF:
c     b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 14975 -14976  14977 -812 1162 0


c  2-1 --> 1
c    (-b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧ -p_812) -> (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0)
c  in CNF:
c     b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_2
c     b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_1
c     b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨  b^{29, 29}_0
c  in DIMACS:
 14975 -14976  14977  812 -14978 0
 14975 -14976  14977  812 -14979 0
 14975 -14976  14977  812  14980 0

c  1-1 --> 0
c    (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0 ∧ -p_812) -> (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧ -b^{29, 29}_0)
c  in CNF:
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_2
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_1
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_0
c  in DIMACS:
 14975  14976 -14977  812 -14978 0
 14975  14976 -14977  812 -14979 0
 14975  14976 -14977  812 -14980 0

c  0-1 --> -1
c    (-b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧ -p_812) -> ( b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0)
c  in CNF:
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨  b^{29, 29}_2
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_1
c     b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨  b^{29, 29}_0
c  in DIMACS:
 14975  14976  14977  812  14978 0
 14975  14976  14977  812 -14979 0
 14975  14976  14977  812  14980 0

c  -1-1 --> -2
c    ( b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧  b^{29, 28}_0 ∧ -p_812) -> ( b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0)
c  in CNF:
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨  b^{29, 29}_2
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨  b^{29, 29}_1
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨  p_812 ∨ -b^{29, 29}_0
c  in DIMACS:
-14975  14976 -14977  812  14978 0
-14975  14976 -14977  812  14979 0
-14975  14976 -14977  812 -14980 0

c  -2-1 --> break 
c    ( b^{29, 28}_2 ∧  b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨  b^{29, 28}_0 ∨  p_812 ∨ break
c  in DIMACS:
-14975 -14976  14977  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 28}_2 ∧ -b^{29, 28}_1 ∧ -b^{29, 28}_0 ∧ true) 
c  in CNF:
c    -b^{29, 28}_2 ∨  b^{29, 28}_1 ∨  b^{29, 28}_0 ∨ false 
c  in DIMACS:
-14975  14976  14977  0

c  3 does not represent an automaton state.
c    -(-b^{29, 28}_2 ∧  b^{29, 28}_1 ∧  b^{29, 28}_0 ∧ true) 
c  in CNF:
c     b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ false 
c  in DIMACS:
 14975 -14976 -14977  0
c  -3 does not represent an automaton state.
c    -( b^{29, 28}_2 ∧  b^{29, 28}_1 ∧  b^{29, 28}_0 ∧ true) 
c  in CNF:
c    -b^{29, 28}_2 ∨ -b^{29, 28}_1 ∨ -b^{29, 28}_0 ∨ false 
c  in DIMACS:
-14975 -14976 -14977  0

c i = 29
c  -2+1 --> -1
c    ( b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧  p_841) -> ( b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0)
c  in CNF:
c    -b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨  b^{29, 30}_2
c    -b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_1
c    -b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨  b^{29, 30}_0
c  in DIMACS:
-14978 -14979  14980 -841  14981 0
-14978 -14979  14980 -841 -14982 0
-14978 -14979  14980 -841  14983 0

c  -1+1 --> 0
c    ( b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0 ∧  p_841) -> (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧ -b^{29, 30}_0)
c  in CNF:
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_2
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_1
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_0
c  in DIMACS:
-14978  14979 -14980 -841 -14981 0
-14978  14979 -14980 -841 -14982 0
-14978  14979 -14980 -841 -14983 0

c  0+1 --> 1
c    (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧  p_841) -> (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0)
c  in CNF:
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_2
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_1
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨  b^{29, 30}_0
c  in DIMACS:
 14978  14979  14980 -841 -14981 0
 14978  14979  14980 -841 -14982 0
 14978  14979  14980 -841  14983 0

c  1+1 --> 2
c    (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0 ∧  p_841) -> (-b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0)
c  in CNF:
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_2
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨  b^{29, 30}_1
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ -p_841 ∨ -b^{29, 30}_0
c  in DIMACS:
 14978  14979 -14980 -841 -14981 0
 14978  14979 -14980 -841  14982 0
 14978  14979 -14980 -841 -14983 0

c  2+1 --> break 
c    (-b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧  p_841) -> break
c  in CNF:
c     b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ -p_841 ∨ break
c  in DIMACS:
 14978 -14979  14980 -841 1162 0


c  2-1 --> 1
c    (-b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧ -p_841) -> (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0)
c  in CNF:
c     b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_2
c     b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_1
c     b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨  b^{29, 30}_0
c  in DIMACS:
 14978 -14979  14980  841 -14981 0
 14978 -14979  14980  841 -14982 0
 14978 -14979  14980  841  14983 0

c  1-1 --> 0
c    (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0 ∧ -p_841) -> (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧ -b^{29, 30}_0)
c  in CNF:
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_2
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_1
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_0
c  in DIMACS:
 14978  14979 -14980  841 -14981 0
 14978  14979 -14980  841 -14982 0
 14978  14979 -14980  841 -14983 0

c  0-1 --> -1
c    (-b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧ -p_841) -> ( b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0)
c  in CNF:
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨  b^{29, 30}_2
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_1
c     b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨  b^{29, 30}_0
c  in DIMACS:
 14978  14979  14980  841  14981 0
 14978  14979  14980  841 -14982 0
 14978  14979  14980  841  14983 0

c  -1-1 --> -2
c    ( b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧  b^{29, 29}_0 ∧ -p_841) -> ( b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0)
c  in CNF:
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨  b^{29, 30}_2
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨  b^{29, 30}_1
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨  p_841 ∨ -b^{29, 30}_0
c  in DIMACS:
-14978  14979 -14980  841  14981 0
-14978  14979 -14980  841  14982 0
-14978  14979 -14980  841 -14983 0

c  -2-1 --> break 
c    ( b^{29, 29}_2 ∧  b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧ -p_841) -> break
c  in CNF:
c    -b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨  b^{29, 29}_0 ∨  p_841 ∨ break
c  in DIMACS:
-14978 -14979  14980  841 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 29}_2 ∧ -b^{29, 29}_1 ∧ -b^{29, 29}_0 ∧ true) 
c  in CNF:
c    -b^{29, 29}_2 ∨  b^{29, 29}_1 ∨  b^{29, 29}_0 ∨ false 
c  in DIMACS:
-14978  14979  14980  0

c  3 does not represent an automaton state.
c    -(-b^{29, 29}_2 ∧  b^{29, 29}_1 ∧  b^{29, 29}_0 ∧ true) 
c  in CNF:
c     b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ false 
c  in DIMACS:
 14978 -14979 -14980  0
c  -3 does not represent an automaton state.
c    -( b^{29, 29}_2 ∧  b^{29, 29}_1 ∧  b^{29, 29}_0 ∧ true) 
c  in CNF:
c    -b^{29, 29}_2 ∨ -b^{29, 29}_1 ∨ -b^{29, 29}_0 ∨ false 
c  in DIMACS:
-14978 -14979 -14980  0

c i = 30
c  -2+1 --> -1
c    ( b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧  p_870) -> ( b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0)
c  in CNF:
c    -b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨  b^{29, 31}_2
c    -b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_1
c    -b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨  b^{29, 31}_0
c  in DIMACS:
-14981 -14982  14983 -870  14984 0
-14981 -14982  14983 -870 -14985 0
-14981 -14982  14983 -870  14986 0

c  -1+1 --> 0
c    ( b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0 ∧  p_870) -> (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧ -b^{29, 31}_0)
c  in CNF:
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_2
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_1
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_0
c  in DIMACS:
-14981  14982 -14983 -870 -14984 0
-14981  14982 -14983 -870 -14985 0
-14981  14982 -14983 -870 -14986 0

c  0+1 --> 1
c    (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧  p_870) -> (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0)
c  in CNF:
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_2
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_1
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨  b^{29, 31}_0
c  in DIMACS:
 14981  14982  14983 -870 -14984 0
 14981  14982  14983 -870 -14985 0
 14981  14982  14983 -870  14986 0

c  1+1 --> 2
c    (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0 ∧  p_870) -> (-b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0)
c  in CNF:
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_2
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨  b^{29, 31}_1
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ -p_870 ∨ -b^{29, 31}_0
c  in DIMACS:
 14981  14982 -14983 -870 -14984 0
 14981  14982 -14983 -870  14985 0
 14981  14982 -14983 -870 -14986 0

c  2+1 --> break 
c    (-b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧  p_870) -> break
c  in CNF:
c     b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 14981 -14982  14983 -870 1162 0


c  2-1 --> 1
c    (-b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧ -p_870) -> (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0)
c  in CNF:
c     b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_2
c     b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_1
c     b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨  b^{29, 31}_0
c  in DIMACS:
 14981 -14982  14983  870 -14984 0
 14981 -14982  14983  870 -14985 0
 14981 -14982  14983  870  14986 0

c  1-1 --> 0
c    (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0 ∧ -p_870) -> (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧ -b^{29, 31}_0)
c  in CNF:
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_2
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_1
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_0
c  in DIMACS:
 14981  14982 -14983  870 -14984 0
 14981  14982 -14983  870 -14985 0
 14981  14982 -14983  870 -14986 0

c  0-1 --> -1
c    (-b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧ -p_870) -> ( b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0)
c  in CNF:
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨  b^{29, 31}_2
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_1
c     b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨  b^{29, 31}_0
c  in DIMACS:
 14981  14982  14983  870  14984 0
 14981  14982  14983  870 -14985 0
 14981  14982  14983  870  14986 0

c  -1-1 --> -2
c    ( b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧  b^{29, 30}_0 ∧ -p_870) -> ( b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0)
c  in CNF:
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨  b^{29, 31}_2
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨  b^{29, 31}_1
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨  p_870 ∨ -b^{29, 31}_0
c  in DIMACS:
-14981  14982 -14983  870  14984 0
-14981  14982 -14983  870  14985 0
-14981  14982 -14983  870 -14986 0

c  -2-1 --> break 
c    ( b^{29, 30}_2 ∧  b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨  b^{29, 30}_0 ∨  p_870 ∨ break
c  in DIMACS:
-14981 -14982  14983  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 30}_2 ∧ -b^{29, 30}_1 ∧ -b^{29, 30}_0 ∧ true) 
c  in CNF:
c    -b^{29, 30}_2 ∨  b^{29, 30}_1 ∨  b^{29, 30}_0 ∨ false 
c  in DIMACS:
-14981  14982  14983  0

c  3 does not represent an automaton state.
c    -(-b^{29, 30}_2 ∧  b^{29, 30}_1 ∧  b^{29, 30}_0 ∧ true) 
c  in CNF:
c     b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ false 
c  in DIMACS:
 14981 -14982 -14983  0
c  -3 does not represent an automaton state.
c    -( b^{29, 30}_2 ∧  b^{29, 30}_1 ∧  b^{29, 30}_0 ∧ true) 
c  in CNF:
c    -b^{29, 30}_2 ∨ -b^{29, 30}_1 ∨ -b^{29, 30}_0 ∨ false 
c  in DIMACS:
-14981 -14982 -14983  0

c i = 31
c  -2+1 --> -1
c    ( b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧  p_899) -> ( b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0)
c  in CNF:
c    -b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨  b^{29, 32}_2
c    -b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_1
c    -b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨  b^{29, 32}_0
c  in DIMACS:
-14984 -14985  14986 -899  14987 0
-14984 -14985  14986 -899 -14988 0
-14984 -14985  14986 -899  14989 0

c  -1+1 --> 0
c    ( b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0 ∧  p_899) -> (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧ -b^{29, 32}_0)
c  in CNF:
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_2
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_1
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_0
c  in DIMACS:
-14984  14985 -14986 -899 -14987 0
-14984  14985 -14986 -899 -14988 0
-14984  14985 -14986 -899 -14989 0

c  0+1 --> 1
c    (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧  p_899) -> (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0)
c  in CNF:
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_2
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_1
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨  b^{29, 32}_0
c  in DIMACS:
 14984  14985  14986 -899 -14987 0
 14984  14985  14986 -899 -14988 0
 14984  14985  14986 -899  14989 0

c  1+1 --> 2
c    (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0 ∧  p_899) -> (-b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0)
c  in CNF:
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_2
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨  b^{29, 32}_1
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ -p_899 ∨ -b^{29, 32}_0
c  in DIMACS:
 14984  14985 -14986 -899 -14987 0
 14984  14985 -14986 -899  14988 0
 14984  14985 -14986 -899 -14989 0

c  2+1 --> break 
c    (-b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧  p_899) -> break
c  in CNF:
c     b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ -p_899 ∨ break
c  in DIMACS:
 14984 -14985  14986 -899 1162 0


c  2-1 --> 1
c    (-b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧ -p_899) -> (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0)
c  in CNF:
c     b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_2
c     b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_1
c     b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨  b^{29, 32}_0
c  in DIMACS:
 14984 -14985  14986  899 -14987 0
 14984 -14985  14986  899 -14988 0
 14984 -14985  14986  899  14989 0

c  1-1 --> 0
c    (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0 ∧ -p_899) -> (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧ -b^{29, 32}_0)
c  in CNF:
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_2
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_1
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_0
c  in DIMACS:
 14984  14985 -14986  899 -14987 0
 14984  14985 -14986  899 -14988 0
 14984  14985 -14986  899 -14989 0

c  0-1 --> -1
c    (-b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧ -p_899) -> ( b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0)
c  in CNF:
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨  b^{29, 32}_2
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_1
c     b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨  b^{29, 32}_0
c  in DIMACS:
 14984  14985  14986  899  14987 0
 14984  14985  14986  899 -14988 0
 14984  14985  14986  899  14989 0

c  -1-1 --> -2
c    ( b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧  b^{29, 31}_0 ∧ -p_899) -> ( b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0)
c  in CNF:
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨  b^{29, 32}_2
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨  b^{29, 32}_1
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨  p_899 ∨ -b^{29, 32}_0
c  in DIMACS:
-14984  14985 -14986  899  14987 0
-14984  14985 -14986  899  14988 0
-14984  14985 -14986  899 -14989 0

c  -2-1 --> break 
c    ( b^{29, 31}_2 ∧  b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧ -p_899) -> break
c  in CNF:
c    -b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨  b^{29, 31}_0 ∨  p_899 ∨ break
c  in DIMACS:
-14984 -14985  14986  899 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 31}_2 ∧ -b^{29, 31}_1 ∧ -b^{29, 31}_0 ∧ true) 
c  in CNF:
c    -b^{29, 31}_2 ∨  b^{29, 31}_1 ∨  b^{29, 31}_0 ∨ false 
c  in DIMACS:
-14984  14985  14986  0

c  3 does not represent an automaton state.
c    -(-b^{29, 31}_2 ∧  b^{29, 31}_1 ∧  b^{29, 31}_0 ∧ true) 
c  in CNF:
c     b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ false 
c  in DIMACS:
 14984 -14985 -14986  0
c  -3 does not represent an automaton state.
c    -( b^{29, 31}_2 ∧  b^{29, 31}_1 ∧  b^{29, 31}_0 ∧ true) 
c  in CNF:
c    -b^{29, 31}_2 ∨ -b^{29, 31}_1 ∨ -b^{29, 31}_0 ∨ false 
c  in DIMACS:
-14984 -14985 -14986  0

c i = 32
c  -2+1 --> -1
c    ( b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧  p_928) -> ( b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0)
c  in CNF:
c    -b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨  b^{29, 33}_2
c    -b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_1
c    -b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨  b^{29, 33}_0
c  in DIMACS:
-14987 -14988  14989 -928  14990 0
-14987 -14988  14989 -928 -14991 0
-14987 -14988  14989 -928  14992 0

c  -1+1 --> 0
c    ( b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0 ∧  p_928) -> (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧ -b^{29, 33}_0)
c  in CNF:
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_2
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_1
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_0
c  in DIMACS:
-14987  14988 -14989 -928 -14990 0
-14987  14988 -14989 -928 -14991 0
-14987  14988 -14989 -928 -14992 0

c  0+1 --> 1
c    (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧  p_928) -> (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0)
c  in CNF:
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_2
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_1
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨  b^{29, 33}_0
c  in DIMACS:
 14987  14988  14989 -928 -14990 0
 14987  14988  14989 -928 -14991 0
 14987  14988  14989 -928  14992 0

c  1+1 --> 2
c    (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0 ∧  p_928) -> (-b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0)
c  in CNF:
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_2
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨  b^{29, 33}_1
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ -p_928 ∨ -b^{29, 33}_0
c  in DIMACS:
 14987  14988 -14989 -928 -14990 0
 14987  14988 -14989 -928  14991 0
 14987  14988 -14989 -928 -14992 0

c  2+1 --> break 
c    (-b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧  p_928) -> break
c  in CNF:
c     b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 14987 -14988  14989 -928 1162 0


c  2-1 --> 1
c    (-b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧ -p_928) -> (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0)
c  in CNF:
c     b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_2
c     b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_1
c     b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨  b^{29, 33}_0
c  in DIMACS:
 14987 -14988  14989  928 -14990 0
 14987 -14988  14989  928 -14991 0
 14987 -14988  14989  928  14992 0

c  1-1 --> 0
c    (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0 ∧ -p_928) -> (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧ -b^{29, 33}_0)
c  in CNF:
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_2
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_1
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_0
c  in DIMACS:
 14987  14988 -14989  928 -14990 0
 14987  14988 -14989  928 -14991 0
 14987  14988 -14989  928 -14992 0

c  0-1 --> -1
c    (-b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧ -p_928) -> ( b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0)
c  in CNF:
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨  b^{29, 33}_2
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_1
c     b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨  b^{29, 33}_0
c  in DIMACS:
 14987  14988  14989  928  14990 0
 14987  14988  14989  928 -14991 0
 14987  14988  14989  928  14992 0

c  -1-1 --> -2
c    ( b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧  b^{29, 32}_0 ∧ -p_928) -> ( b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0)
c  in CNF:
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨  b^{29, 33}_2
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨  b^{29, 33}_1
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨  p_928 ∨ -b^{29, 33}_0
c  in DIMACS:
-14987  14988 -14989  928  14990 0
-14987  14988 -14989  928  14991 0
-14987  14988 -14989  928 -14992 0

c  -2-1 --> break 
c    ( b^{29, 32}_2 ∧  b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨  b^{29, 32}_0 ∨  p_928 ∨ break
c  in DIMACS:
-14987 -14988  14989  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 32}_2 ∧ -b^{29, 32}_1 ∧ -b^{29, 32}_0 ∧ true) 
c  in CNF:
c    -b^{29, 32}_2 ∨  b^{29, 32}_1 ∨  b^{29, 32}_0 ∨ false 
c  in DIMACS:
-14987  14988  14989  0

c  3 does not represent an automaton state.
c    -(-b^{29, 32}_2 ∧  b^{29, 32}_1 ∧  b^{29, 32}_0 ∧ true) 
c  in CNF:
c     b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ false 
c  in DIMACS:
 14987 -14988 -14989  0
c  -3 does not represent an automaton state.
c    -( b^{29, 32}_2 ∧  b^{29, 32}_1 ∧  b^{29, 32}_0 ∧ true) 
c  in CNF:
c    -b^{29, 32}_2 ∨ -b^{29, 32}_1 ∨ -b^{29, 32}_0 ∨ false 
c  in DIMACS:
-14987 -14988 -14989  0

c i = 33
c  -2+1 --> -1
c    ( b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧  p_957) -> ( b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0)
c  in CNF:
c    -b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨  b^{29, 34}_2
c    -b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_1
c    -b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨  b^{29, 34}_0
c  in DIMACS:
-14990 -14991  14992 -957  14993 0
-14990 -14991  14992 -957 -14994 0
-14990 -14991  14992 -957  14995 0

c  -1+1 --> 0
c    ( b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0 ∧  p_957) -> (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧ -b^{29, 34}_0)
c  in CNF:
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_2
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_1
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_0
c  in DIMACS:
-14990  14991 -14992 -957 -14993 0
-14990  14991 -14992 -957 -14994 0
-14990  14991 -14992 -957 -14995 0

c  0+1 --> 1
c    (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧  p_957) -> (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0)
c  in CNF:
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_2
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_1
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨  b^{29, 34}_0
c  in DIMACS:
 14990  14991  14992 -957 -14993 0
 14990  14991  14992 -957 -14994 0
 14990  14991  14992 -957  14995 0

c  1+1 --> 2
c    (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0 ∧  p_957) -> (-b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0)
c  in CNF:
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_2
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨  b^{29, 34}_1
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ -p_957 ∨ -b^{29, 34}_0
c  in DIMACS:
 14990  14991 -14992 -957 -14993 0
 14990  14991 -14992 -957  14994 0
 14990  14991 -14992 -957 -14995 0

c  2+1 --> break 
c    (-b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧  p_957) -> break
c  in CNF:
c     b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 14990 -14991  14992 -957 1162 0


c  2-1 --> 1
c    (-b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧ -p_957) -> (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0)
c  in CNF:
c     b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_2
c     b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_1
c     b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨  b^{29, 34}_0
c  in DIMACS:
 14990 -14991  14992  957 -14993 0
 14990 -14991  14992  957 -14994 0
 14990 -14991  14992  957  14995 0

c  1-1 --> 0
c    (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0 ∧ -p_957) -> (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧ -b^{29, 34}_0)
c  in CNF:
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_2
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_1
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_0
c  in DIMACS:
 14990  14991 -14992  957 -14993 0
 14990  14991 -14992  957 -14994 0
 14990  14991 -14992  957 -14995 0

c  0-1 --> -1
c    (-b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧ -p_957) -> ( b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0)
c  in CNF:
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨  b^{29, 34}_2
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_1
c     b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨  b^{29, 34}_0
c  in DIMACS:
 14990  14991  14992  957  14993 0
 14990  14991  14992  957 -14994 0
 14990  14991  14992  957  14995 0

c  -1-1 --> -2
c    ( b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧  b^{29, 33}_0 ∧ -p_957) -> ( b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0)
c  in CNF:
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨  b^{29, 34}_2
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨  b^{29, 34}_1
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨  p_957 ∨ -b^{29, 34}_0
c  in DIMACS:
-14990  14991 -14992  957  14993 0
-14990  14991 -14992  957  14994 0
-14990  14991 -14992  957 -14995 0

c  -2-1 --> break 
c    ( b^{29, 33}_2 ∧  b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨  b^{29, 33}_0 ∨  p_957 ∨ break
c  in DIMACS:
-14990 -14991  14992  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 33}_2 ∧ -b^{29, 33}_1 ∧ -b^{29, 33}_0 ∧ true) 
c  in CNF:
c    -b^{29, 33}_2 ∨  b^{29, 33}_1 ∨  b^{29, 33}_0 ∨ false 
c  in DIMACS:
-14990  14991  14992  0

c  3 does not represent an automaton state.
c    -(-b^{29, 33}_2 ∧  b^{29, 33}_1 ∧  b^{29, 33}_0 ∧ true) 
c  in CNF:
c     b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ false 
c  in DIMACS:
 14990 -14991 -14992  0
c  -3 does not represent an automaton state.
c    -( b^{29, 33}_2 ∧  b^{29, 33}_1 ∧  b^{29, 33}_0 ∧ true) 
c  in CNF:
c    -b^{29, 33}_2 ∨ -b^{29, 33}_1 ∨ -b^{29, 33}_0 ∨ false 
c  in DIMACS:
-14990 -14991 -14992  0

c i = 34
c  -2+1 --> -1
c    ( b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧  p_986) -> ( b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0)
c  in CNF:
c    -b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨  b^{29, 35}_2
c    -b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_1
c    -b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨  b^{29, 35}_0
c  in DIMACS:
-14993 -14994  14995 -986  14996 0
-14993 -14994  14995 -986 -14997 0
-14993 -14994  14995 -986  14998 0

c  -1+1 --> 0
c    ( b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0 ∧  p_986) -> (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧ -b^{29, 35}_0)
c  in CNF:
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_2
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_1
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_0
c  in DIMACS:
-14993  14994 -14995 -986 -14996 0
-14993  14994 -14995 -986 -14997 0
-14993  14994 -14995 -986 -14998 0

c  0+1 --> 1
c    (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧  p_986) -> (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0)
c  in CNF:
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_2
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_1
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨  b^{29, 35}_0
c  in DIMACS:
 14993  14994  14995 -986 -14996 0
 14993  14994  14995 -986 -14997 0
 14993  14994  14995 -986  14998 0

c  1+1 --> 2
c    (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0 ∧  p_986) -> (-b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0)
c  in CNF:
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_2
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨  b^{29, 35}_1
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ -p_986 ∨ -b^{29, 35}_0
c  in DIMACS:
 14993  14994 -14995 -986 -14996 0
 14993  14994 -14995 -986  14997 0
 14993  14994 -14995 -986 -14998 0

c  2+1 --> break 
c    (-b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧  p_986) -> break
c  in CNF:
c     b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 14993 -14994  14995 -986 1162 0


c  2-1 --> 1
c    (-b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧ -p_986) -> (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0)
c  in CNF:
c     b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_2
c     b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_1
c     b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨  b^{29, 35}_0
c  in DIMACS:
 14993 -14994  14995  986 -14996 0
 14993 -14994  14995  986 -14997 0
 14993 -14994  14995  986  14998 0

c  1-1 --> 0
c    (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0 ∧ -p_986) -> (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧ -b^{29, 35}_0)
c  in CNF:
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_2
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_1
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_0
c  in DIMACS:
 14993  14994 -14995  986 -14996 0
 14993  14994 -14995  986 -14997 0
 14993  14994 -14995  986 -14998 0

c  0-1 --> -1
c    (-b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧ -p_986) -> ( b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0)
c  in CNF:
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨  b^{29, 35}_2
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_1
c     b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨  b^{29, 35}_0
c  in DIMACS:
 14993  14994  14995  986  14996 0
 14993  14994  14995  986 -14997 0
 14993  14994  14995  986  14998 0

c  -1-1 --> -2
c    ( b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧  b^{29, 34}_0 ∧ -p_986) -> ( b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0)
c  in CNF:
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨  b^{29, 35}_2
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨  b^{29, 35}_1
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨  p_986 ∨ -b^{29, 35}_0
c  in DIMACS:
-14993  14994 -14995  986  14996 0
-14993  14994 -14995  986  14997 0
-14993  14994 -14995  986 -14998 0

c  -2-1 --> break 
c    ( b^{29, 34}_2 ∧  b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨  b^{29, 34}_0 ∨  p_986 ∨ break
c  in DIMACS:
-14993 -14994  14995  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 34}_2 ∧ -b^{29, 34}_1 ∧ -b^{29, 34}_0 ∧ true) 
c  in CNF:
c    -b^{29, 34}_2 ∨  b^{29, 34}_1 ∨  b^{29, 34}_0 ∨ false 
c  in DIMACS:
-14993  14994  14995  0

c  3 does not represent an automaton state.
c    -(-b^{29, 34}_2 ∧  b^{29, 34}_1 ∧  b^{29, 34}_0 ∧ true) 
c  in CNF:
c     b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ false 
c  in DIMACS:
 14993 -14994 -14995  0
c  -3 does not represent an automaton state.
c    -( b^{29, 34}_2 ∧  b^{29, 34}_1 ∧  b^{29, 34}_0 ∧ true) 
c  in CNF:
c    -b^{29, 34}_2 ∨ -b^{29, 34}_1 ∨ -b^{29, 34}_0 ∨ false 
c  in DIMACS:
-14993 -14994 -14995  0

c i = 35
c  -2+1 --> -1
c    ( b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧  p_1015) -> ( b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0)
c  in CNF:
c    -b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨  b^{29, 36}_2
c    -b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_1
c    -b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨  b^{29, 36}_0
c  in DIMACS:
-14996 -14997  14998 -1015  14999 0
-14996 -14997  14998 -1015 -15000 0
-14996 -14997  14998 -1015  15001 0

c  -1+1 --> 0
c    ( b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0 ∧  p_1015) -> (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧ -b^{29, 36}_0)
c  in CNF:
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_2
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_1
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_0
c  in DIMACS:
-14996  14997 -14998 -1015 -14999 0
-14996  14997 -14998 -1015 -15000 0
-14996  14997 -14998 -1015 -15001 0

c  0+1 --> 1
c    (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧  p_1015) -> (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0)
c  in CNF:
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_2
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_1
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨  b^{29, 36}_0
c  in DIMACS:
 14996  14997  14998 -1015 -14999 0
 14996  14997  14998 -1015 -15000 0
 14996  14997  14998 -1015  15001 0

c  1+1 --> 2
c    (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0 ∧  p_1015) -> (-b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0)
c  in CNF:
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_2
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨  b^{29, 36}_1
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ -p_1015 ∨ -b^{29, 36}_0
c  in DIMACS:
 14996  14997 -14998 -1015 -14999 0
 14996  14997 -14998 -1015  15000 0
 14996  14997 -14998 -1015 -15001 0

c  2+1 --> break 
c    (-b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 14996 -14997  14998 -1015 1162 0


c  2-1 --> 1
c    (-b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧ -p_1015) -> (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0)
c  in CNF:
c     b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_2
c     b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_1
c     b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨  b^{29, 36}_0
c  in DIMACS:
 14996 -14997  14998  1015 -14999 0
 14996 -14997  14998  1015 -15000 0
 14996 -14997  14998  1015  15001 0

c  1-1 --> 0
c    (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0 ∧ -p_1015) -> (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧ -b^{29, 36}_0)
c  in CNF:
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_2
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_1
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_0
c  in DIMACS:
 14996  14997 -14998  1015 -14999 0
 14996  14997 -14998  1015 -15000 0
 14996  14997 -14998  1015 -15001 0

c  0-1 --> -1
c    (-b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧ -p_1015) -> ( b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0)
c  in CNF:
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨  b^{29, 36}_2
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_1
c     b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨  b^{29, 36}_0
c  in DIMACS:
 14996  14997  14998  1015  14999 0
 14996  14997  14998  1015 -15000 0
 14996  14997  14998  1015  15001 0

c  -1-1 --> -2
c    ( b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧  b^{29, 35}_0 ∧ -p_1015) -> ( b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0)
c  in CNF:
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨  b^{29, 36}_2
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨  b^{29, 36}_1
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨  p_1015 ∨ -b^{29, 36}_0
c  in DIMACS:
-14996  14997 -14998  1015  14999 0
-14996  14997 -14998  1015  15000 0
-14996  14997 -14998  1015 -15001 0

c  -2-1 --> break 
c    ( b^{29, 35}_2 ∧  b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨  b^{29, 35}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-14996 -14997  14998  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 35}_2 ∧ -b^{29, 35}_1 ∧ -b^{29, 35}_0 ∧ true) 
c  in CNF:
c    -b^{29, 35}_2 ∨  b^{29, 35}_1 ∨  b^{29, 35}_0 ∨ false 
c  in DIMACS:
-14996  14997  14998  0

c  3 does not represent an automaton state.
c    -(-b^{29, 35}_2 ∧  b^{29, 35}_1 ∧  b^{29, 35}_0 ∧ true) 
c  in CNF:
c     b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ false 
c  in DIMACS:
 14996 -14997 -14998  0
c  -3 does not represent an automaton state.
c    -( b^{29, 35}_2 ∧  b^{29, 35}_1 ∧  b^{29, 35}_0 ∧ true) 
c  in CNF:
c    -b^{29, 35}_2 ∨ -b^{29, 35}_1 ∨ -b^{29, 35}_0 ∨ false 
c  in DIMACS:
-14996 -14997 -14998  0

c i = 36
c  -2+1 --> -1
c    ( b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧  p_1044) -> ( b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0)
c  in CNF:
c    -b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨  b^{29, 37}_2
c    -b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_1
c    -b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨  b^{29, 37}_0
c  in DIMACS:
-14999 -15000  15001 -1044  15002 0
-14999 -15000  15001 -1044 -15003 0
-14999 -15000  15001 -1044  15004 0

c  -1+1 --> 0
c    ( b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0 ∧  p_1044) -> (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧ -b^{29, 37}_0)
c  in CNF:
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_2
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_1
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_0
c  in DIMACS:
-14999  15000 -15001 -1044 -15002 0
-14999  15000 -15001 -1044 -15003 0
-14999  15000 -15001 -1044 -15004 0

c  0+1 --> 1
c    (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧  p_1044) -> (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0)
c  in CNF:
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_2
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_1
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨  b^{29, 37}_0
c  in DIMACS:
 14999  15000  15001 -1044 -15002 0
 14999  15000  15001 -1044 -15003 0
 14999  15000  15001 -1044  15004 0

c  1+1 --> 2
c    (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0 ∧  p_1044) -> (-b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0)
c  in CNF:
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_2
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨  b^{29, 37}_1
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ -p_1044 ∨ -b^{29, 37}_0
c  in DIMACS:
 14999  15000 -15001 -1044 -15002 0
 14999  15000 -15001 -1044  15003 0
 14999  15000 -15001 -1044 -15004 0

c  2+1 --> break 
c    (-b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 14999 -15000  15001 -1044 1162 0


c  2-1 --> 1
c    (-b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧ -p_1044) -> (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0)
c  in CNF:
c     b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_2
c     b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_1
c     b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨  b^{29, 37}_0
c  in DIMACS:
 14999 -15000  15001  1044 -15002 0
 14999 -15000  15001  1044 -15003 0
 14999 -15000  15001  1044  15004 0

c  1-1 --> 0
c    (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0 ∧ -p_1044) -> (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧ -b^{29, 37}_0)
c  in CNF:
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_2
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_1
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_0
c  in DIMACS:
 14999  15000 -15001  1044 -15002 0
 14999  15000 -15001  1044 -15003 0
 14999  15000 -15001  1044 -15004 0

c  0-1 --> -1
c    (-b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧ -p_1044) -> ( b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0)
c  in CNF:
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨  b^{29, 37}_2
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_1
c     b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨  b^{29, 37}_0
c  in DIMACS:
 14999  15000  15001  1044  15002 0
 14999  15000  15001  1044 -15003 0
 14999  15000  15001  1044  15004 0

c  -1-1 --> -2
c    ( b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧  b^{29, 36}_0 ∧ -p_1044) -> ( b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0)
c  in CNF:
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨  b^{29, 37}_2
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨  b^{29, 37}_1
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨  p_1044 ∨ -b^{29, 37}_0
c  in DIMACS:
-14999  15000 -15001  1044  15002 0
-14999  15000 -15001  1044  15003 0
-14999  15000 -15001  1044 -15004 0

c  -2-1 --> break 
c    ( b^{29, 36}_2 ∧  b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨  b^{29, 36}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-14999 -15000  15001  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 36}_2 ∧ -b^{29, 36}_1 ∧ -b^{29, 36}_0 ∧ true) 
c  in CNF:
c    -b^{29, 36}_2 ∨  b^{29, 36}_1 ∨  b^{29, 36}_0 ∨ false 
c  in DIMACS:
-14999  15000  15001  0

c  3 does not represent an automaton state.
c    -(-b^{29, 36}_2 ∧  b^{29, 36}_1 ∧  b^{29, 36}_0 ∧ true) 
c  in CNF:
c     b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ false 
c  in DIMACS:
 14999 -15000 -15001  0
c  -3 does not represent an automaton state.
c    -( b^{29, 36}_2 ∧  b^{29, 36}_1 ∧  b^{29, 36}_0 ∧ true) 
c  in CNF:
c    -b^{29, 36}_2 ∨ -b^{29, 36}_1 ∨ -b^{29, 36}_0 ∨ false 
c  in DIMACS:
-14999 -15000 -15001  0

c i = 37
c  -2+1 --> -1
c    ( b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧  p_1073) -> ( b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0)
c  in CNF:
c    -b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨  b^{29, 38}_2
c    -b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_1
c    -b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨  b^{29, 38}_0
c  in DIMACS:
-15002 -15003  15004 -1073  15005 0
-15002 -15003  15004 -1073 -15006 0
-15002 -15003  15004 -1073  15007 0

c  -1+1 --> 0
c    ( b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0 ∧  p_1073) -> (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧ -b^{29, 38}_0)
c  in CNF:
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_2
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_1
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_0
c  in DIMACS:
-15002  15003 -15004 -1073 -15005 0
-15002  15003 -15004 -1073 -15006 0
-15002  15003 -15004 -1073 -15007 0

c  0+1 --> 1
c    (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧  p_1073) -> (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0)
c  in CNF:
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_2
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_1
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨  b^{29, 38}_0
c  in DIMACS:
 15002  15003  15004 -1073 -15005 0
 15002  15003  15004 -1073 -15006 0
 15002  15003  15004 -1073  15007 0

c  1+1 --> 2
c    (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0 ∧  p_1073) -> (-b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0)
c  in CNF:
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_2
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨  b^{29, 38}_1
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ -p_1073 ∨ -b^{29, 38}_0
c  in DIMACS:
 15002  15003 -15004 -1073 -15005 0
 15002  15003 -15004 -1073  15006 0
 15002  15003 -15004 -1073 -15007 0

c  2+1 --> break 
c    (-b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧  p_1073) -> break
c  in CNF:
c     b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ -p_1073 ∨ break
c  in DIMACS:
 15002 -15003  15004 -1073 1162 0


c  2-1 --> 1
c    (-b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧ -p_1073) -> (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0)
c  in CNF:
c     b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_2
c     b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_1
c     b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨  b^{29, 38}_0
c  in DIMACS:
 15002 -15003  15004  1073 -15005 0
 15002 -15003  15004  1073 -15006 0
 15002 -15003  15004  1073  15007 0

c  1-1 --> 0
c    (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0 ∧ -p_1073) -> (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧ -b^{29, 38}_0)
c  in CNF:
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_2
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_1
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_0
c  in DIMACS:
 15002  15003 -15004  1073 -15005 0
 15002  15003 -15004  1073 -15006 0
 15002  15003 -15004  1073 -15007 0

c  0-1 --> -1
c    (-b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧ -p_1073) -> ( b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0)
c  in CNF:
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨  b^{29, 38}_2
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_1
c     b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨  b^{29, 38}_0
c  in DIMACS:
 15002  15003  15004  1073  15005 0
 15002  15003  15004  1073 -15006 0
 15002  15003  15004  1073  15007 0

c  -1-1 --> -2
c    ( b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧  b^{29, 37}_0 ∧ -p_1073) -> ( b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0)
c  in CNF:
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨  b^{29, 38}_2
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨  b^{29, 38}_1
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨  p_1073 ∨ -b^{29, 38}_0
c  in DIMACS:
-15002  15003 -15004  1073  15005 0
-15002  15003 -15004  1073  15006 0
-15002  15003 -15004  1073 -15007 0

c  -2-1 --> break 
c    ( b^{29, 37}_2 ∧  b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧ -p_1073) -> break
c  in CNF:
c    -b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨  b^{29, 37}_0 ∨  p_1073 ∨ break
c  in DIMACS:
-15002 -15003  15004  1073 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 37}_2 ∧ -b^{29, 37}_1 ∧ -b^{29, 37}_0 ∧ true) 
c  in CNF:
c    -b^{29, 37}_2 ∨  b^{29, 37}_1 ∨  b^{29, 37}_0 ∨ false 
c  in DIMACS:
-15002  15003  15004  0

c  3 does not represent an automaton state.
c    -(-b^{29, 37}_2 ∧  b^{29, 37}_1 ∧  b^{29, 37}_0 ∧ true) 
c  in CNF:
c     b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ false 
c  in DIMACS:
 15002 -15003 -15004  0
c  -3 does not represent an automaton state.
c    -( b^{29, 37}_2 ∧  b^{29, 37}_1 ∧  b^{29, 37}_0 ∧ true) 
c  in CNF:
c    -b^{29, 37}_2 ∨ -b^{29, 37}_1 ∨ -b^{29, 37}_0 ∨ false 
c  in DIMACS:
-15002 -15003 -15004  0

c i = 38
c  -2+1 --> -1
c    ( b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧  p_1102) -> ( b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0)
c  in CNF:
c    -b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨  b^{29, 39}_2
c    -b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_1
c    -b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨  b^{29, 39}_0
c  in DIMACS:
-15005 -15006  15007 -1102  15008 0
-15005 -15006  15007 -1102 -15009 0
-15005 -15006  15007 -1102  15010 0

c  -1+1 --> 0
c    ( b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0 ∧  p_1102) -> (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧ -b^{29, 39}_0)
c  in CNF:
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_2
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_1
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_0
c  in DIMACS:
-15005  15006 -15007 -1102 -15008 0
-15005  15006 -15007 -1102 -15009 0
-15005  15006 -15007 -1102 -15010 0

c  0+1 --> 1
c    (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧  p_1102) -> (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0)
c  in CNF:
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_2
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_1
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨  b^{29, 39}_0
c  in DIMACS:
 15005  15006  15007 -1102 -15008 0
 15005  15006  15007 -1102 -15009 0
 15005  15006  15007 -1102  15010 0

c  1+1 --> 2
c    (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0 ∧  p_1102) -> (-b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0)
c  in CNF:
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_2
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨  b^{29, 39}_1
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ -p_1102 ∨ -b^{29, 39}_0
c  in DIMACS:
 15005  15006 -15007 -1102 -15008 0
 15005  15006 -15007 -1102  15009 0
 15005  15006 -15007 -1102 -15010 0

c  2+1 --> break 
c    (-b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 15005 -15006  15007 -1102 1162 0


c  2-1 --> 1
c    (-b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧ -p_1102) -> (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0)
c  in CNF:
c     b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_2
c     b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_1
c     b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨  b^{29, 39}_0
c  in DIMACS:
 15005 -15006  15007  1102 -15008 0
 15005 -15006  15007  1102 -15009 0
 15005 -15006  15007  1102  15010 0

c  1-1 --> 0
c    (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0 ∧ -p_1102) -> (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧ -b^{29, 39}_0)
c  in CNF:
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_2
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_1
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_0
c  in DIMACS:
 15005  15006 -15007  1102 -15008 0
 15005  15006 -15007  1102 -15009 0
 15005  15006 -15007  1102 -15010 0

c  0-1 --> -1
c    (-b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧ -p_1102) -> ( b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0)
c  in CNF:
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨  b^{29, 39}_2
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_1
c     b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨  b^{29, 39}_0
c  in DIMACS:
 15005  15006  15007  1102  15008 0
 15005  15006  15007  1102 -15009 0
 15005  15006  15007  1102  15010 0

c  -1-1 --> -2
c    ( b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧  b^{29, 38}_0 ∧ -p_1102) -> ( b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0)
c  in CNF:
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨  b^{29, 39}_2
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨  b^{29, 39}_1
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨  p_1102 ∨ -b^{29, 39}_0
c  in DIMACS:
-15005  15006 -15007  1102  15008 0
-15005  15006 -15007  1102  15009 0
-15005  15006 -15007  1102 -15010 0

c  -2-1 --> break 
c    ( b^{29, 38}_2 ∧  b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨  b^{29, 38}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-15005 -15006  15007  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 38}_2 ∧ -b^{29, 38}_1 ∧ -b^{29, 38}_0 ∧ true) 
c  in CNF:
c    -b^{29, 38}_2 ∨  b^{29, 38}_1 ∨  b^{29, 38}_0 ∨ false 
c  in DIMACS:
-15005  15006  15007  0

c  3 does not represent an automaton state.
c    -(-b^{29, 38}_2 ∧  b^{29, 38}_1 ∧  b^{29, 38}_0 ∧ true) 
c  in CNF:
c     b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ false 
c  in DIMACS:
 15005 -15006 -15007  0
c  -3 does not represent an automaton state.
c    -( b^{29, 38}_2 ∧  b^{29, 38}_1 ∧  b^{29, 38}_0 ∧ true) 
c  in CNF:
c    -b^{29, 38}_2 ∨ -b^{29, 38}_1 ∨ -b^{29, 38}_0 ∨ false 
c  in DIMACS:
-15005 -15006 -15007  0

c i = 39
c  -2+1 --> -1
c    ( b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧  p_1131) -> ( b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0)
c  in CNF:
c    -b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨  b^{29, 40}_2
c    -b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_1
c    -b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨  b^{29, 40}_0
c  in DIMACS:
-15008 -15009  15010 -1131  15011 0
-15008 -15009  15010 -1131 -15012 0
-15008 -15009  15010 -1131  15013 0

c  -1+1 --> 0
c    ( b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0 ∧  p_1131) -> (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧ -b^{29, 40}_0)
c  in CNF:
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_2
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_1
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_0
c  in DIMACS:
-15008  15009 -15010 -1131 -15011 0
-15008  15009 -15010 -1131 -15012 0
-15008  15009 -15010 -1131 -15013 0

c  0+1 --> 1
c    (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧  p_1131) -> (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0)
c  in CNF:
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_2
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_1
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨  b^{29, 40}_0
c  in DIMACS:
 15008  15009  15010 -1131 -15011 0
 15008  15009  15010 -1131 -15012 0
 15008  15009  15010 -1131  15013 0

c  1+1 --> 2
c    (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0 ∧  p_1131) -> (-b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0)
c  in CNF:
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_2
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨  b^{29, 40}_1
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ -p_1131 ∨ -b^{29, 40}_0
c  in DIMACS:
 15008  15009 -15010 -1131 -15011 0
 15008  15009 -15010 -1131  15012 0
 15008  15009 -15010 -1131 -15013 0

c  2+1 --> break 
c    (-b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 15008 -15009  15010 -1131 1162 0


c  2-1 --> 1
c    (-b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧ -p_1131) -> (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0)
c  in CNF:
c     b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_2
c     b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_1
c     b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨  b^{29, 40}_0
c  in DIMACS:
 15008 -15009  15010  1131 -15011 0
 15008 -15009  15010  1131 -15012 0
 15008 -15009  15010  1131  15013 0

c  1-1 --> 0
c    (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0 ∧ -p_1131) -> (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧ -b^{29, 40}_0)
c  in CNF:
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_2
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_1
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_0
c  in DIMACS:
 15008  15009 -15010  1131 -15011 0
 15008  15009 -15010  1131 -15012 0
 15008  15009 -15010  1131 -15013 0

c  0-1 --> -1
c    (-b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧ -p_1131) -> ( b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0)
c  in CNF:
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨  b^{29, 40}_2
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_1
c     b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨  b^{29, 40}_0
c  in DIMACS:
 15008  15009  15010  1131  15011 0
 15008  15009  15010  1131 -15012 0
 15008  15009  15010  1131  15013 0

c  -1-1 --> -2
c    ( b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧  b^{29, 39}_0 ∧ -p_1131) -> ( b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0)
c  in CNF:
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨  b^{29, 40}_2
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨  b^{29, 40}_1
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨  p_1131 ∨ -b^{29, 40}_0
c  in DIMACS:
-15008  15009 -15010  1131  15011 0
-15008  15009 -15010  1131  15012 0
-15008  15009 -15010  1131 -15013 0

c  -2-1 --> break 
c    ( b^{29, 39}_2 ∧  b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨  b^{29, 39}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-15008 -15009  15010  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 39}_2 ∧ -b^{29, 39}_1 ∧ -b^{29, 39}_0 ∧ true) 
c  in CNF:
c    -b^{29, 39}_2 ∨  b^{29, 39}_1 ∨  b^{29, 39}_0 ∨ false 
c  in DIMACS:
-15008  15009  15010  0

c  3 does not represent an automaton state.
c    -(-b^{29, 39}_2 ∧  b^{29, 39}_1 ∧  b^{29, 39}_0 ∧ true) 
c  in CNF:
c     b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ false 
c  in DIMACS:
 15008 -15009 -15010  0
c  -3 does not represent an automaton state.
c    -( b^{29, 39}_2 ∧  b^{29, 39}_1 ∧  b^{29, 39}_0 ∧ true) 
c  in CNF:
c    -b^{29, 39}_2 ∨ -b^{29, 39}_1 ∨ -b^{29, 39}_0 ∨ false 
c  in DIMACS:
-15008 -15009 -15010  0

c i = 40
c  -2+1 --> -1
c    ( b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧  p_1160) -> ( b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧  b^{29, 41}_0)
c  in CNF:
c    -b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨  b^{29, 41}_2
c    -b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_1
c    -b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨  b^{29, 41}_0
c  in DIMACS:
-15011 -15012  15013 -1160  15014 0
-15011 -15012  15013 -1160 -15015 0
-15011 -15012  15013 -1160  15016 0

c  -1+1 --> 0
c    ( b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0 ∧  p_1160) -> (-b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧ -b^{29, 41}_0)
c  in CNF:
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_2
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_1
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_0
c  in DIMACS:
-15011  15012 -15013 -1160 -15014 0
-15011  15012 -15013 -1160 -15015 0
-15011  15012 -15013 -1160 -15016 0

c  0+1 --> 1
c    (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧  p_1160) -> (-b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧  b^{29, 41}_0)
c  in CNF:
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_2
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_1
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨  b^{29, 41}_0
c  in DIMACS:
 15011  15012  15013 -1160 -15014 0
 15011  15012  15013 -1160 -15015 0
 15011  15012  15013 -1160  15016 0

c  1+1 --> 2
c    (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0 ∧  p_1160) -> (-b^{29, 41}_2 ∧  b^{29, 41}_1 ∧ -b^{29, 41}_0)
c  in CNF:
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_2
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨  b^{29, 41}_1
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ -p_1160 ∨ -b^{29, 41}_0
c  in DIMACS:
 15011  15012 -15013 -1160 -15014 0
 15011  15012 -15013 -1160  15015 0
 15011  15012 -15013 -1160 -15016 0

c  2+1 --> break 
c    (-b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 15011 -15012  15013 -1160 1162 0


c  2-1 --> 1
c    (-b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧ -p_1160) -> (-b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧  b^{29, 41}_0)
c  in CNF:
c     b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_2
c     b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_1
c     b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨  b^{29, 41}_0
c  in DIMACS:
 15011 -15012  15013  1160 -15014 0
 15011 -15012  15013  1160 -15015 0
 15011 -15012  15013  1160  15016 0

c  1-1 --> 0
c    (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0 ∧ -p_1160) -> (-b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧ -b^{29, 41}_0)
c  in CNF:
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_2
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_1
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_0
c  in DIMACS:
 15011  15012 -15013  1160 -15014 0
 15011  15012 -15013  1160 -15015 0
 15011  15012 -15013  1160 -15016 0

c  0-1 --> -1
c    (-b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧ -p_1160) -> ( b^{29, 41}_2 ∧ -b^{29, 41}_1 ∧  b^{29, 41}_0)
c  in CNF:
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨  b^{29, 41}_2
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_1
c     b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨  b^{29, 41}_0
c  in DIMACS:
 15011  15012  15013  1160  15014 0
 15011  15012  15013  1160 -15015 0
 15011  15012  15013  1160  15016 0

c  -1-1 --> -2
c    ( b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧  b^{29, 40}_0 ∧ -p_1160) -> ( b^{29, 41}_2 ∧  b^{29, 41}_1 ∧ -b^{29, 41}_0)
c  in CNF:
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨  b^{29, 41}_2
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨  b^{29, 41}_1
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨  p_1160 ∨ -b^{29, 41}_0
c  in DIMACS:
-15011  15012 -15013  1160  15014 0
-15011  15012 -15013  1160  15015 0
-15011  15012 -15013  1160 -15016 0

c  -2-1 --> break 
c    ( b^{29, 40}_2 ∧  b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨  b^{29, 40}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-15011 -15012  15013  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{29, 40}_2 ∧ -b^{29, 40}_1 ∧ -b^{29, 40}_0 ∧ true) 
c  in CNF:
c    -b^{29, 40}_2 ∨  b^{29, 40}_1 ∨  b^{29, 40}_0 ∨ false 
c  in DIMACS:
-15011  15012  15013  0

c  3 does not represent an automaton state.
c    -(-b^{29, 40}_2 ∧  b^{29, 40}_1 ∧  b^{29, 40}_0 ∧ true) 
c  in CNF:
c     b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ false 
c  in DIMACS:
 15011 -15012 -15013  0
c  -3 does not represent an automaton state.
c    -( b^{29, 40}_2 ∧  b^{29, 40}_1 ∧  b^{29, 40}_0 ∧ true) 
c  in CNF:
c    -b^{29, 40}_2 ∨ -b^{29, 40}_1 ∨ -b^{29, 40}_0 ∨ false 
c  in DIMACS:
-15011 -15012 -15013  0

c INIT for k = 30
c    -b^{30, 1}_2
c    -b^{30, 1}_1
c    -b^{30, 1}_0
c  in DIMACS:
-15017 0
-15018 0
-15019 0

c Transitions for k = 30
c i = 1
c  -2+1 --> -1
c    ( b^{30, 1}_2 ∧  b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧  p_30) -> ( b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0)
c  in CNF:
c    -b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨  b^{30, 2}_2
c    -b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_1
c    -b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨  b^{30, 2}_0
c  in DIMACS:
-15017 -15018  15019 -30  15020 0
-15017 -15018  15019 -30 -15021 0
-15017 -15018  15019 -30  15022 0

c  -1+1 --> 0
c    ( b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧  b^{30, 1}_0 ∧  p_30) -> (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧ -b^{30, 2}_0)
c  in CNF:
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_2
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_1
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_0
c  in DIMACS:
-15017  15018 -15019 -30 -15020 0
-15017  15018 -15019 -30 -15021 0
-15017  15018 -15019 -30 -15022 0

c  0+1 --> 1
c    (-b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧  p_30) -> (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0)
c  in CNF:
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_2
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_1
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨  b^{30, 2}_0
c  in DIMACS:
 15017  15018  15019 -30 -15020 0
 15017  15018  15019 -30 -15021 0
 15017  15018  15019 -30  15022 0

c  1+1 --> 2
c    (-b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧  b^{30, 1}_0 ∧  p_30) -> (-b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0)
c  in CNF:
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_2
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨  b^{30, 2}_1
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ -p_30 ∨ -b^{30, 2}_0
c  in DIMACS:
 15017  15018 -15019 -30 -15020 0
 15017  15018 -15019 -30  15021 0
 15017  15018 -15019 -30 -15022 0

c  2+1 --> break 
c    (-b^{30, 1}_2 ∧  b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧  p_30) -> break
c  in CNF:
c     b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ -p_30 ∨ break
c  in DIMACS:
 15017 -15018  15019 -30 1162 0


c  2-1 --> 1
c    (-b^{30, 1}_2 ∧  b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧ -p_30) -> (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0)
c  in CNF:
c     b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_2
c     b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_1
c     b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨  b^{30, 2}_0
c  in DIMACS:
 15017 -15018  15019  30 -15020 0
 15017 -15018  15019  30 -15021 0
 15017 -15018  15019  30  15022 0

c  1-1 --> 0
c    (-b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧  b^{30, 1}_0 ∧ -p_30) -> (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧ -b^{30, 2}_0)
c  in CNF:
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_2
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_1
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_0
c  in DIMACS:
 15017  15018 -15019  30 -15020 0
 15017  15018 -15019  30 -15021 0
 15017  15018 -15019  30 -15022 0

c  0-1 --> -1
c    (-b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧ -p_30) -> ( b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0)
c  in CNF:
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨  b^{30, 2}_2
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_1
c     b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨  b^{30, 2}_0
c  in DIMACS:
 15017  15018  15019  30  15020 0
 15017  15018  15019  30 -15021 0
 15017  15018  15019  30  15022 0

c  -1-1 --> -2
c    ( b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧  b^{30, 1}_0 ∧ -p_30) -> ( b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0)
c  in CNF:
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨  b^{30, 2}_2
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨  b^{30, 2}_1
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨  p_30 ∨ -b^{30, 2}_0
c  in DIMACS:
-15017  15018 -15019  30  15020 0
-15017  15018 -15019  30  15021 0
-15017  15018 -15019  30 -15022 0

c  -2-1 --> break 
c    ( b^{30, 1}_2 ∧  b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧ -p_30) -> break
c  in CNF:
c    -b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨  b^{30, 1}_0 ∨  p_30 ∨ break
c  in DIMACS:
-15017 -15018  15019  30 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 1}_2 ∧ -b^{30, 1}_1 ∧ -b^{30, 1}_0 ∧ true) 
c  in CNF:
c    -b^{30, 1}_2 ∨  b^{30, 1}_1 ∨  b^{30, 1}_0 ∨ false 
c  in DIMACS:
-15017  15018  15019  0

c  3 does not represent an automaton state.
c    -(-b^{30, 1}_2 ∧  b^{30, 1}_1 ∧  b^{30, 1}_0 ∧ true) 
c  in CNF:
c     b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ false 
c  in DIMACS:
 15017 -15018 -15019  0
c  -3 does not represent an automaton state.
c    -( b^{30, 1}_2 ∧  b^{30, 1}_1 ∧  b^{30, 1}_0 ∧ true) 
c  in CNF:
c    -b^{30, 1}_2 ∨ -b^{30, 1}_1 ∨ -b^{30, 1}_0 ∨ false 
c  in DIMACS:
-15017 -15018 -15019  0

c i = 2
c  -2+1 --> -1
c    ( b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧  p_60) -> ( b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0)
c  in CNF:
c    -b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨  b^{30, 3}_2
c    -b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_1
c    -b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨  b^{30, 3}_0
c  in DIMACS:
-15020 -15021  15022 -60  15023 0
-15020 -15021  15022 -60 -15024 0
-15020 -15021  15022 -60  15025 0

c  -1+1 --> 0
c    ( b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0 ∧  p_60) -> (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧ -b^{30, 3}_0)
c  in CNF:
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_2
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_1
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_0
c  in DIMACS:
-15020  15021 -15022 -60 -15023 0
-15020  15021 -15022 -60 -15024 0
-15020  15021 -15022 -60 -15025 0

c  0+1 --> 1
c    (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧  p_60) -> (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0)
c  in CNF:
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_2
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_1
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨  b^{30, 3}_0
c  in DIMACS:
 15020  15021  15022 -60 -15023 0
 15020  15021  15022 -60 -15024 0
 15020  15021  15022 -60  15025 0

c  1+1 --> 2
c    (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0 ∧  p_60) -> (-b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0)
c  in CNF:
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_2
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨  b^{30, 3}_1
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ -p_60 ∨ -b^{30, 3}_0
c  in DIMACS:
 15020  15021 -15022 -60 -15023 0
 15020  15021 -15022 -60  15024 0
 15020  15021 -15022 -60 -15025 0

c  2+1 --> break 
c    (-b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧  p_60) -> break
c  in CNF:
c     b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 15020 -15021  15022 -60 1162 0


c  2-1 --> 1
c    (-b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧ -p_60) -> (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0)
c  in CNF:
c     b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_2
c     b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_1
c     b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨  b^{30, 3}_0
c  in DIMACS:
 15020 -15021  15022  60 -15023 0
 15020 -15021  15022  60 -15024 0
 15020 -15021  15022  60  15025 0

c  1-1 --> 0
c    (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0 ∧ -p_60) -> (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧ -b^{30, 3}_0)
c  in CNF:
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_2
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_1
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_0
c  in DIMACS:
 15020  15021 -15022  60 -15023 0
 15020  15021 -15022  60 -15024 0
 15020  15021 -15022  60 -15025 0

c  0-1 --> -1
c    (-b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧ -p_60) -> ( b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0)
c  in CNF:
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨  b^{30, 3}_2
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_1
c     b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨  b^{30, 3}_0
c  in DIMACS:
 15020  15021  15022  60  15023 0
 15020  15021  15022  60 -15024 0
 15020  15021  15022  60  15025 0

c  -1-1 --> -2
c    ( b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧  b^{30, 2}_0 ∧ -p_60) -> ( b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0)
c  in CNF:
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨  b^{30, 3}_2
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨  b^{30, 3}_1
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨  p_60 ∨ -b^{30, 3}_0
c  in DIMACS:
-15020  15021 -15022  60  15023 0
-15020  15021 -15022  60  15024 0
-15020  15021 -15022  60 -15025 0

c  -2-1 --> break 
c    ( b^{30, 2}_2 ∧  b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨  b^{30, 2}_0 ∨  p_60 ∨ break
c  in DIMACS:
-15020 -15021  15022  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 2}_2 ∧ -b^{30, 2}_1 ∧ -b^{30, 2}_0 ∧ true) 
c  in CNF:
c    -b^{30, 2}_2 ∨  b^{30, 2}_1 ∨  b^{30, 2}_0 ∨ false 
c  in DIMACS:
-15020  15021  15022  0

c  3 does not represent an automaton state.
c    -(-b^{30, 2}_2 ∧  b^{30, 2}_1 ∧  b^{30, 2}_0 ∧ true) 
c  in CNF:
c     b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ false 
c  in DIMACS:
 15020 -15021 -15022  0
c  -3 does not represent an automaton state.
c    -( b^{30, 2}_2 ∧  b^{30, 2}_1 ∧  b^{30, 2}_0 ∧ true) 
c  in CNF:
c    -b^{30, 2}_2 ∨ -b^{30, 2}_1 ∨ -b^{30, 2}_0 ∨ false 
c  in DIMACS:
-15020 -15021 -15022  0

c i = 3
c  -2+1 --> -1
c    ( b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧  p_90) -> ( b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0)
c  in CNF:
c    -b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨  b^{30, 4}_2
c    -b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_1
c    -b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨  b^{30, 4}_0
c  in DIMACS:
-15023 -15024  15025 -90  15026 0
-15023 -15024  15025 -90 -15027 0
-15023 -15024  15025 -90  15028 0

c  -1+1 --> 0
c    ( b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0 ∧  p_90) -> (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧ -b^{30, 4}_0)
c  in CNF:
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_2
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_1
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_0
c  in DIMACS:
-15023  15024 -15025 -90 -15026 0
-15023  15024 -15025 -90 -15027 0
-15023  15024 -15025 -90 -15028 0

c  0+1 --> 1
c    (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧  p_90) -> (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0)
c  in CNF:
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_2
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_1
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨  b^{30, 4}_0
c  in DIMACS:
 15023  15024  15025 -90 -15026 0
 15023  15024  15025 -90 -15027 0
 15023  15024  15025 -90  15028 0

c  1+1 --> 2
c    (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0 ∧  p_90) -> (-b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0)
c  in CNF:
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_2
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨  b^{30, 4}_1
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ -p_90 ∨ -b^{30, 4}_0
c  in DIMACS:
 15023  15024 -15025 -90 -15026 0
 15023  15024 -15025 -90  15027 0
 15023  15024 -15025 -90 -15028 0

c  2+1 --> break 
c    (-b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧  p_90) -> break
c  in CNF:
c     b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 15023 -15024  15025 -90 1162 0


c  2-1 --> 1
c    (-b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧ -p_90) -> (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0)
c  in CNF:
c     b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_2
c     b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_1
c     b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨  b^{30, 4}_0
c  in DIMACS:
 15023 -15024  15025  90 -15026 0
 15023 -15024  15025  90 -15027 0
 15023 -15024  15025  90  15028 0

c  1-1 --> 0
c    (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0 ∧ -p_90) -> (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧ -b^{30, 4}_0)
c  in CNF:
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_2
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_1
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_0
c  in DIMACS:
 15023  15024 -15025  90 -15026 0
 15023  15024 -15025  90 -15027 0
 15023  15024 -15025  90 -15028 0

c  0-1 --> -1
c    (-b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧ -p_90) -> ( b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0)
c  in CNF:
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨  b^{30, 4}_2
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_1
c     b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨  b^{30, 4}_0
c  in DIMACS:
 15023  15024  15025  90  15026 0
 15023  15024  15025  90 -15027 0
 15023  15024  15025  90  15028 0

c  -1-1 --> -2
c    ( b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧  b^{30, 3}_0 ∧ -p_90) -> ( b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0)
c  in CNF:
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨  b^{30, 4}_2
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨  b^{30, 4}_1
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨  p_90 ∨ -b^{30, 4}_0
c  in DIMACS:
-15023  15024 -15025  90  15026 0
-15023  15024 -15025  90  15027 0
-15023  15024 -15025  90 -15028 0

c  -2-1 --> break 
c    ( b^{30, 3}_2 ∧  b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨  b^{30, 3}_0 ∨  p_90 ∨ break
c  in DIMACS:
-15023 -15024  15025  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 3}_2 ∧ -b^{30, 3}_1 ∧ -b^{30, 3}_0 ∧ true) 
c  in CNF:
c    -b^{30, 3}_2 ∨  b^{30, 3}_1 ∨  b^{30, 3}_0 ∨ false 
c  in DIMACS:
-15023  15024  15025  0

c  3 does not represent an automaton state.
c    -(-b^{30, 3}_2 ∧  b^{30, 3}_1 ∧  b^{30, 3}_0 ∧ true) 
c  in CNF:
c     b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ false 
c  in DIMACS:
 15023 -15024 -15025  0
c  -3 does not represent an automaton state.
c    -( b^{30, 3}_2 ∧  b^{30, 3}_1 ∧  b^{30, 3}_0 ∧ true) 
c  in CNF:
c    -b^{30, 3}_2 ∨ -b^{30, 3}_1 ∨ -b^{30, 3}_0 ∨ false 
c  in DIMACS:
-15023 -15024 -15025  0

c i = 4
c  -2+1 --> -1
c    ( b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧  p_120) -> ( b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0)
c  in CNF:
c    -b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨  b^{30, 5}_2
c    -b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_1
c    -b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨  b^{30, 5}_0
c  in DIMACS:
-15026 -15027  15028 -120  15029 0
-15026 -15027  15028 -120 -15030 0
-15026 -15027  15028 -120  15031 0

c  -1+1 --> 0
c    ( b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0 ∧  p_120) -> (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧ -b^{30, 5}_0)
c  in CNF:
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_2
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_1
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_0
c  in DIMACS:
-15026  15027 -15028 -120 -15029 0
-15026  15027 -15028 -120 -15030 0
-15026  15027 -15028 -120 -15031 0

c  0+1 --> 1
c    (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧  p_120) -> (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0)
c  in CNF:
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_2
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_1
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨  b^{30, 5}_0
c  in DIMACS:
 15026  15027  15028 -120 -15029 0
 15026  15027  15028 -120 -15030 0
 15026  15027  15028 -120  15031 0

c  1+1 --> 2
c    (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0 ∧  p_120) -> (-b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0)
c  in CNF:
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_2
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨  b^{30, 5}_1
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ -p_120 ∨ -b^{30, 5}_0
c  in DIMACS:
 15026  15027 -15028 -120 -15029 0
 15026  15027 -15028 -120  15030 0
 15026  15027 -15028 -120 -15031 0

c  2+1 --> break 
c    (-b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧  p_120) -> break
c  in CNF:
c     b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 15026 -15027  15028 -120 1162 0


c  2-1 --> 1
c    (-b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧ -p_120) -> (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0)
c  in CNF:
c     b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_2
c     b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_1
c     b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨  b^{30, 5}_0
c  in DIMACS:
 15026 -15027  15028  120 -15029 0
 15026 -15027  15028  120 -15030 0
 15026 -15027  15028  120  15031 0

c  1-1 --> 0
c    (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0 ∧ -p_120) -> (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧ -b^{30, 5}_0)
c  in CNF:
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_2
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_1
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_0
c  in DIMACS:
 15026  15027 -15028  120 -15029 0
 15026  15027 -15028  120 -15030 0
 15026  15027 -15028  120 -15031 0

c  0-1 --> -1
c    (-b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧ -p_120) -> ( b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0)
c  in CNF:
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨  b^{30, 5}_2
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_1
c     b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨  b^{30, 5}_0
c  in DIMACS:
 15026  15027  15028  120  15029 0
 15026  15027  15028  120 -15030 0
 15026  15027  15028  120  15031 0

c  -1-1 --> -2
c    ( b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧  b^{30, 4}_0 ∧ -p_120) -> ( b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0)
c  in CNF:
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨  b^{30, 5}_2
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨  b^{30, 5}_1
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨  p_120 ∨ -b^{30, 5}_0
c  in DIMACS:
-15026  15027 -15028  120  15029 0
-15026  15027 -15028  120  15030 0
-15026  15027 -15028  120 -15031 0

c  -2-1 --> break 
c    ( b^{30, 4}_2 ∧  b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨  b^{30, 4}_0 ∨  p_120 ∨ break
c  in DIMACS:
-15026 -15027  15028  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 4}_2 ∧ -b^{30, 4}_1 ∧ -b^{30, 4}_0 ∧ true) 
c  in CNF:
c    -b^{30, 4}_2 ∨  b^{30, 4}_1 ∨  b^{30, 4}_0 ∨ false 
c  in DIMACS:
-15026  15027  15028  0

c  3 does not represent an automaton state.
c    -(-b^{30, 4}_2 ∧  b^{30, 4}_1 ∧  b^{30, 4}_0 ∧ true) 
c  in CNF:
c     b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ false 
c  in DIMACS:
 15026 -15027 -15028  0
c  -3 does not represent an automaton state.
c    -( b^{30, 4}_2 ∧  b^{30, 4}_1 ∧  b^{30, 4}_0 ∧ true) 
c  in CNF:
c    -b^{30, 4}_2 ∨ -b^{30, 4}_1 ∨ -b^{30, 4}_0 ∨ false 
c  in DIMACS:
-15026 -15027 -15028  0

c i = 5
c  -2+1 --> -1
c    ( b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧  p_150) -> ( b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0)
c  in CNF:
c    -b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨  b^{30, 6}_2
c    -b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_1
c    -b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨  b^{30, 6}_0
c  in DIMACS:
-15029 -15030  15031 -150  15032 0
-15029 -15030  15031 -150 -15033 0
-15029 -15030  15031 -150  15034 0

c  -1+1 --> 0
c    ( b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0 ∧  p_150) -> (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧ -b^{30, 6}_0)
c  in CNF:
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_2
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_1
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_0
c  in DIMACS:
-15029  15030 -15031 -150 -15032 0
-15029  15030 -15031 -150 -15033 0
-15029  15030 -15031 -150 -15034 0

c  0+1 --> 1
c    (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧  p_150) -> (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0)
c  in CNF:
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_2
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_1
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨  b^{30, 6}_0
c  in DIMACS:
 15029  15030  15031 -150 -15032 0
 15029  15030  15031 -150 -15033 0
 15029  15030  15031 -150  15034 0

c  1+1 --> 2
c    (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0 ∧  p_150) -> (-b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0)
c  in CNF:
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_2
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨  b^{30, 6}_1
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ -p_150 ∨ -b^{30, 6}_0
c  in DIMACS:
 15029  15030 -15031 -150 -15032 0
 15029  15030 -15031 -150  15033 0
 15029  15030 -15031 -150 -15034 0

c  2+1 --> break 
c    (-b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧  p_150) -> break
c  in CNF:
c     b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 15029 -15030  15031 -150 1162 0


c  2-1 --> 1
c    (-b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧ -p_150) -> (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0)
c  in CNF:
c     b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_2
c     b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_1
c     b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨  b^{30, 6}_0
c  in DIMACS:
 15029 -15030  15031  150 -15032 0
 15029 -15030  15031  150 -15033 0
 15029 -15030  15031  150  15034 0

c  1-1 --> 0
c    (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0 ∧ -p_150) -> (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧ -b^{30, 6}_0)
c  in CNF:
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_2
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_1
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_0
c  in DIMACS:
 15029  15030 -15031  150 -15032 0
 15029  15030 -15031  150 -15033 0
 15029  15030 -15031  150 -15034 0

c  0-1 --> -1
c    (-b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧ -p_150) -> ( b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0)
c  in CNF:
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨  b^{30, 6}_2
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_1
c     b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨  b^{30, 6}_0
c  in DIMACS:
 15029  15030  15031  150  15032 0
 15029  15030  15031  150 -15033 0
 15029  15030  15031  150  15034 0

c  -1-1 --> -2
c    ( b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧  b^{30, 5}_0 ∧ -p_150) -> ( b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0)
c  in CNF:
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨  b^{30, 6}_2
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨  b^{30, 6}_1
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨  p_150 ∨ -b^{30, 6}_0
c  in DIMACS:
-15029  15030 -15031  150  15032 0
-15029  15030 -15031  150  15033 0
-15029  15030 -15031  150 -15034 0

c  -2-1 --> break 
c    ( b^{30, 5}_2 ∧  b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨  b^{30, 5}_0 ∨  p_150 ∨ break
c  in DIMACS:
-15029 -15030  15031  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 5}_2 ∧ -b^{30, 5}_1 ∧ -b^{30, 5}_0 ∧ true) 
c  in CNF:
c    -b^{30, 5}_2 ∨  b^{30, 5}_1 ∨  b^{30, 5}_0 ∨ false 
c  in DIMACS:
-15029  15030  15031  0

c  3 does not represent an automaton state.
c    -(-b^{30, 5}_2 ∧  b^{30, 5}_1 ∧  b^{30, 5}_0 ∧ true) 
c  in CNF:
c     b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ false 
c  in DIMACS:
 15029 -15030 -15031  0
c  -3 does not represent an automaton state.
c    -( b^{30, 5}_2 ∧  b^{30, 5}_1 ∧  b^{30, 5}_0 ∧ true) 
c  in CNF:
c    -b^{30, 5}_2 ∨ -b^{30, 5}_1 ∨ -b^{30, 5}_0 ∨ false 
c  in DIMACS:
-15029 -15030 -15031  0

c i = 6
c  -2+1 --> -1
c    ( b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧  p_180) -> ( b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0)
c  in CNF:
c    -b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨  b^{30, 7}_2
c    -b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_1
c    -b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨  b^{30, 7}_0
c  in DIMACS:
-15032 -15033  15034 -180  15035 0
-15032 -15033  15034 -180 -15036 0
-15032 -15033  15034 -180  15037 0

c  -1+1 --> 0
c    ( b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0 ∧  p_180) -> (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧ -b^{30, 7}_0)
c  in CNF:
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_2
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_1
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_0
c  in DIMACS:
-15032  15033 -15034 -180 -15035 0
-15032  15033 -15034 -180 -15036 0
-15032  15033 -15034 -180 -15037 0

c  0+1 --> 1
c    (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧  p_180) -> (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0)
c  in CNF:
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_2
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_1
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨  b^{30, 7}_0
c  in DIMACS:
 15032  15033  15034 -180 -15035 0
 15032  15033  15034 -180 -15036 0
 15032  15033  15034 -180  15037 0

c  1+1 --> 2
c    (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0 ∧  p_180) -> (-b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0)
c  in CNF:
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_2
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨  b^{30, 7}_1
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ -p_180 ∨ -b^{30, 7}_0
c  in DIMACS:
 15032  15033 -15034 -180 -15035 0
 15032  15033 -15034 -180  15036 0
 15032  15033 -15034 -180 -15037 0

c  2+1 --> break 
c    (-b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧  p_180) -> break
c  in CNF:
c     b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 15032 -15033  15034 -180 1162 0


c  2-1 --> 1
c    (-b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧ -p_180) -> (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0)
c  in CNF:
c     b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_2
c     b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_1
c     b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨  b^{30, 7}_0
c  in DIMACS:
 15032 -15033  15034  180 -15035 0
 15032 -15033  15034  180 -15036 0
 15032 -15033  15034  180  15037 0

c  1-1 --> 0
c    (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0 ∧ -p_180) -> (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧ -b^{30, 7}_0)
c  in CNF:
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_2
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_1
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_0
c  in DIMACS:
 15032  15033 -15034  180 -15035 0
 15032  15033 -15034  180 -15036 0
 15032  15033 -15034  180 -15037 0

c  0-1 --> -1
c    (-b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧ -p_180) -> ( b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0)
c  in CNF:
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨  b^{30, 7}_2
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_1
c     b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨  b^{30, 7}_0
c  in DIMACS:
 15032  15033  15034  180  15035 0
 15032  15033  15034  180 -15036 0
 15032  15033  15034  180  15037 0

c  -1-1 --> -2
c    ( b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧  b^{30, 6}_0 ∧ -p_180) -> ( b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0)
c  in CNF:
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨  b^{30, 7}_2
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨  b^{30, 7}_1
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨  p_180 ∨ -b^{30, 7}_0
c  in DIMACS:
-15032  15033 -15034  180  15035 0
-15032  15033 -15034  180  15036 0
-15032  15033 -15034  180 -15037 0

c  -2-1 --> break 
c    ( b^{30, 6}_2 ∧  b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨  b^{30, 6}_0 ∨  p_180 ∨ break
c  in DIMACS:
-15032 -15033  15034  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 6}_2 ∧ -b^{30, 6}_1 ∧ -b^{30, 6}_0 ∧ true) 
c  in CNF:
c    -b^{30, 6}_2 ∨  b^{30, 6}_1 ∨  b^{30, 6}_0 ∨ false 
c  in DIMACS:
-15032  15033  15034  0

c  3 does not represent an automaton state.
c    -(-b^{30, 6}_2 ∧  b^{30, 6}_1 ∧  b^{30, 6}_0 ∧ true) 
c  in CNF:
c     b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ false 
c  in DIMACS:
 15032 -15033 -15034  0
c  -3 does not represent an automaton state.
c    -( b^{30, 6}_2 ∧  b^{30, 6}_1 ∧  b^{30, 6}_0 ∧ true) 
c  in CNF:
c    -b^{30, 6}_2 ∨ -b^{30, 6}_1 ∨ -b^{30, 6}_0 ∨ false 
c  in DIMACS:
-15032 -15033 -15034  0

c i = 7
c  -2+1 --> -1
c    ( b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧  p_210) -> ( b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0)
c  in CNF:
c    -b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨  b^{30, 8}_2
c    -b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_1
c    -b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨  b^{30, 8}_0
c  in DIMACS:
-15035 -15036  15037 -210  15038 0
-15035 -15036  15037 -210 -15039 0
-15035 -15036  15037 -210  15040 0

c  -1+1 --> 0
c    ( b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0 ∧  p_210) -> (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧ -b^{30, 8}_0)
c  in CNF:
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_2
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_1
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_0
c  in DIMACS:
-15035  15036 -15037 -210 -15038 0
-15035  15036 -15037 -210 -15039 0
-15035  15036 -15037 -210 -15040 0

c  0+1 --> 1
c    (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧  p_210) -> (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0)
c  in CNF:
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_2
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_1
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨  b^{30, 8}_0
c  in DIMACS:
 15035  15036  15037 -210 -15038 0
 15035  15036  15037 -210 -15039 0
 15035  15036  15037 -210  15040 0

c  1+1 --> 2
c    (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0 ∧  p_210) -> (-b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0)
c  in CNF:
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_2
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨  b^{30, 8}_1
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ -p_210 ∨ -b^{30, 8}_0
c  in DIMACS:
 15035  15036 -15037 -210 -15038 0
 15035  15036 -15037 -210  15039 0
 15035  15036 -15037 -210 -15040 0

c  2+1 --> break 
c    (-b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧  p_210) -> break
c  in CNF:
c     b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 15035 -15036  15037 -210 1162 0


c  2-1 --> 1
c    (-b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧ -p_210) -> (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0)
c  in CNF:
c     b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_2
c     b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_1
c     b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨  b^{30, 8}_0
c  in DIMACS:
 15035 -15036  15037  210 -15038 0
 15035 -15036  15037  210 -15039 0
 15035 -15036  15037  210  15040 0

c  1-1 --> 0
c    (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0 ∧ -p_210) -> (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧ -b^{30, 8}_0)
c  in CNF:
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_2
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_1
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_0
c  in DIMACS:
 15035  15036 -15037  210 -15038 0
 15035  15036 -15037  210 -15039 0
 15035  15036 -15037  210 -15040 0

c  0-1 --> -1
c    (-b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧ -p_210) -> ( b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0)
c  in CNF:
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨  b^{30, 8}_2
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_1
c     b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨  b^{30, 8}_0
c  in DIMACS:
 15035  15036  15037  210  15038 0
 15035  15036  15037  210 -15039 0
 15035  15036  15037  210  15040 0

c  -1-1 --> -2
c    ( b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧  b^{30, 7}_0 ∧ -p_210) -> ( b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0)
c  in CNF:
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨  b^{30, 8}_2
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨  b^{30, 8}_1
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨  p_210 ∨ -b^{30, 8}_0
c  in DIMACS:
-15035  15036 -15037  210  15038 0
-15035  15036 -15037  210  15039 0
-15035  15036 -15037  210 -15040 0

c  -2-1 --> break 
c    ( b^{30, 7}_2 ∧  b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨  b^{30, 7}_0 ∨  p_210 ∨ break
c  in DIMACS:
-15035 -15036  15037  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 7}_2 ∧ -b^{30, 7}_1 ∧ -b^{30, 7}_0 ∧ true) 
c  in CNF:
c    -b^{30, 7}_2 ∨  b^{30, 7}_1 ∨  b^{30, 7}_0 ∨ false 
c  in DIMACS:
-15035  15036  15037  0

c  3 does not represent an automaton state.
c    -(-b^{30, 7}_2 ∧  b^{30, 7}_1 ∧  b^{30, 7}_0 ∧ true) 
c  in CNF:
c     b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ false 
c  in DIMACS:
 15035 -15036 -15037  0
c  -3 does not represent an automaton state.
c    -( b^{30, 7}_2 ∧  b^{30, 7}_1 ∧  b^{30, 7}_0 ∧ true) 
c  in CNF:
c    -b^{30, 7}_2 ∨ -b^{30, 7}_1 ∨ -b^{30, 7}_0 ∨ false 
c  in DIMACS:
-15035 -15036 -15037  0

c i = 8
c  -2+1 --> -1
c    ( b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧  p_240) -> ( b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0)
c  in CNF:
c    -b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨  b^{30, 9}_2
c    -b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_1
c    -b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨  b^{30, 9}_0
c  in DIMACS:
-15038 -15039  15040 -240  15041 0
-15038 -15039  15040 -240 -15042 0
-15038 -15039  15040 -240  15043 0

c  -1+1 --> 0
c    ( b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0 ∧  p_240) -> (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧ -b^{30, 9}_0)
c  in CNF:
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_2
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_1
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_0
c  in DIMACS:
-15038  15039 -15040 -240 -15041 0
-15038  15039 -15040 -240 -15042 0
-15038  15039 -15040 -240 -15043 0

c  0+1 --> 1
c    (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧  p_240) -> (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0)
c  in CNF:
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_2
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_1
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨  b^{30, 9}_0
c  in DIMACS:
 15038  15039  15040 -240 -15041 0
 15038  15039  15040 -240 -15042 0
 15038  15039  15040 -240  15043 0

c  1+1 --> 2
c    (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0 ∧  p_240) -> (-b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0)
c  in CNF:
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_2
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨  b^{30, 9}_1
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ -p_240 ∨ -b^{30, 9}_0
c  in DIMACS:
 15038  15039 -15040 -240 -15041 0
 15038  15039 -15040 -240  15042 0
 15038  15039 -15040 -240 -15043 0

c  2+1 --> break 
c    (-b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧  p_240) -> break
c  in CNF:
c     b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 15038 -15039  15040 -240 1162 0


c  2-1 --> 1
c    (-b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧ -p_240) -> (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0)
c  in CNF:
c     b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_2
c     b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_1
c     b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨  b^{30, 9}_0
c  in DIMACS:
 15038 -15039  15040  240 -15041 0
 15038 -15039  15040  240 -15042 0
 15038 -15039  15040  240  15043 0

c  1-1 --> 0
c    (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0 ∧ -p_240) -> (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧ -b^{30, 9}_0)
c  in CNF:
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_2
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_1
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_0
c  in DIMACS:
 15038  15039 -15040  240 -15041 0
 15038  15039 -15040  240 -15042 0
 15038  15039 -15040  240 -15043 0

c  0-1 --> -1
c    (-b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧ -p_240) -> ( b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0)
c  in CNF:
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨  b^{30, 9}_2
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_1
c     b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨  b^{30, 9}_0
c  in DIMACS:
 15038  15039  15040  240  15041 0
 15038  15039  15040  240 -15042 0
 15038  15039  15040  240  15043 0

c  -1-1 --> -2
c    ( b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧  b^{30, 8}_0 ∧ -p_240) -> ( b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0)
c  in CNF:
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨  b^{30, 9}_2
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨  b^{30, 9}_1
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨  p_240 ∨ -b^{30, 9}_0
c  in DIMACS:
-15038  15039 -15040  240  15041 0
-15038  15039 -15040  240  15042 0
-15038  15039 -15040  240 -15043 0

c  -2-1 --> break 
c    ( b^{30, 8}_2 ∧  b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨  b^{30, 8}_0 ∨  p_240 ∨ break
c  in DIMACS:
-15038 -15039  15040  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 8}_2 ∧ -b^{30, 8}_1 ∧ -b^{30, 8}_0 ∧ true) 
c  in CNF:
c    -b^{30, 8}_2 ∨  b^{30, 8}_1 ∨  b^{30, 8}_0 ∨ false 
c  in DIMACS:
-15038  15039  15040  0

c  3 does not represent an automaton state.
c    -(-b^{30, 8}_2 ∧  b^{30, 8}_1 ∧  b^{30, 8}_0 ∧ true) 
c  in CNF:
c     b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ false 
c  in DIMACS:
 15038 -15039 -15040  0
c  -3 does not represent an automaton state.
c    -( b^{30, 8}_2 ∧  b^{30, 8}_1 ∧  b^{30, 8}_0 ∧ true) 
c  in CNF:
c    -b^{30, 8}_2 ∨ -b^{30, 8}_1 ∨ -b^{30, 8}_0 ∨ false 
c  in DIMACS:
-15038 -15039 -15040  0

c i = 9
c  -2+1 --> -1
c    ( b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧  p_270) -> ( b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0)
c  in CNF:
c    -b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨  b^{30, 10}_2
c    -b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_1
c    -b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨  b^{30, 10}_0
c  in DIMACS:
-15041 -15042  15043 -270  15044 0
-15041 -15042  15043 -270 -15045 0
-15041 -15042  15043 -270  15046 0

c  -1+1 --> 0
c    ( b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0 ∧  p_270) -> (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧ -b^{30, 10}_0)
c  in CNF:
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_2
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_1
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_0
c  in DIMACS:
-15041  15042 -15043 -270 -15044 0
-15041  15042 -15043 -270 -15045 0
-15041  15042 -15043 -270 -15046 0

c  0+1 --> 1
c    (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧  p_270) -> (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0)
c  in CNF:
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_2
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_1
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨  b^{30, 10}_0
c  in DIMACS:
 15041  15042  15043 -270 -15044 0
 15041  15042  15043 -270 -15045 0
 15041  15042  15043 -270  15046 0

c  1+1 --> 2
c    (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0 ∧  p_270) -> (-b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0)
c  in CNF:
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_2
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨  b^{30, 10}_1
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ -p_270 ∨ -b^{30, 10}_0
c  in DIMACS:
 15041  15042 -15043 -270 -15044 0
 15041  15042 -15043 -270  15045 0
 15041  15042 -15043 -270 -15046 0

c  2+1 --> break 
c    (-b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧  p_270) -> break
c  in CNF:
c     b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 15041 -15042  15043 -270 1162 0


c  2-1 --> 1
c    (-b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧ -p_270) -> (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0)
c  in CNF:
c     b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_2
c     b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_1
c     b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨  b^{30, 10}_0
c  in DIMACS:
 15041 -15042  15043  270 -15044 0
 15041 -15042  15043  270 -15045 0
 15041 -15042  15043  270  15046 0

c  1-1 --> 0
c    (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0 ∧ -p_270) -> (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧ -b^{30, 10}_0)
c  in CNF:
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_2
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_1
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_0
c  in DIMACS:
 15041  15042 -15043  270 -15044 0
 15041  15042 -15043  270 -15045 0
 15041  15042 -15043  270 -15046 0

c  0-1 --> -1
c    (-b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧ -p_270) -> ( b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0)
c  in CNF:
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨  b^{30, 10}_2
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_1
c     b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨  b^{30, 10}_0
c  in DIMACS:
 15041  15042  15043  270  15044 0
 15041  15042  15043  270 -15045 0
 15041  15042  15043  270  15046 0

c  -1-1 --> -2
c    ( b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧  b^{30, 9}_0 ∧ -p_270) -> ( b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0)
c  in CNF:
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨  b^{30, 10}_2
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨  b^{30, 10}_1
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨  p_270 ∨ -b^{30, 10}_0
c  in DIMACS:
-15041  15042 -15043  270  15044 0
-15041  15042 -15043  270  15045 0
-15041  15042 -15043  270 -15046 0

c  -2-1 --> break 
c    ( b^{30, 9}_2 ∧  b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨  b^{30, 9}_0 ∨  p_270 ∨ break
c  in DIMACS:
-15041 -15042  15043  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 9}_2 ∧ -b^{30, 9}_1 ∧ -b^{30, 9}_0 ∧ true) 
c  in CNF:
c    -b^{30, 9}_2 ∨  b^{30, 9}_1 ∨  b^{30, 9}_0 ∨ false 
c  in DIMACS:
-15041  15042  15043  0

c  3 does not represent an automaton state.
c    -(-b^{30, 9}_2 ∧  b^{30, 9}_1 ∧  b^{30, 9}_0 ∧ true) 
c  in CNF:
c     b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ false 
c  in DIMACS:
 15041 -15042 -15043  0
c  -3 does not represent an automaton state.
c    -( b^{30, 9}_2 ∧  b^{30, 9}_1 ∧  b^{30, 9}_0 ∧ true) 
c  in CNF:
c    -b^{30, 9}_2 ∨ -b^{30, 9}_1 ∨ -b^{30, 9}_0 ∨ false 
c  in DIMACS:
-15041 -15042 -15043  0

c i = 10
c  -2+1 --> -1
c    ( b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧  p_300) -> ( b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0)
c  in CNF:
c    -b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨  b^{30, 11}_2
c    -b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_1
c    -b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨  b^{30, 11}_0
c  in DIMACS:
-15044 -15045  15046 -300  15047 0
-15044 -15045  15046 -300 -15048 0
-15044 -15045  15046 -300  15049 0

c  -1+1 --> 0
c    ( b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0 ∧  p_300) -> (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧ -b^{30, 11}_0)
c  in CNF:
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_2
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_1
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_0
c  in DIMACS:
-15044  15045 -15046 -300 -15047 0
-15044  15045 -15046 -300 -15048 0
-15044  15045 -15046 -300 -15049 0

c  0+1 --> 1
c    (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧  p_300) -> (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0)
c  in CNF:
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_2
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_1
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨  b^{30, 11}_0
c  in DIMACS:
 15044  15045  15046 -300 -15047 0
 15044  15045  15046 -300 -15048 0
 15044  15045  15046 -300  15049 0

c  1+1 --> 2
c    (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0 ∧  p_300) -> (-b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0)
c  in CNF:
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_2
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨  b^{30, 11}_1
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ -p_300 ∨ -b^{30, 11}_0
c  in DIMACS:
 15044  15045 -15046 -300 -15047 0
 15044  15045 -15046 -300  15048 0
 15044  15045 -15046 -300 -15049 0

c  2+1 --> break 
c    (-b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧  p_300) -> break
c  in CNF:
c     b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 15044 -15045  15046 -300 1162 0


c  2-1 --> 1
c    (-b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧ -p_300) -> (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0)
c  in CNF:
c     b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_2
c     b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_1
c     b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨  b^{30, 11}_0
c  in DIMACS:
 15044 -15045  15046  300 -15047 0
 15044 -15045  15046  300 -15048 0
 15044 -15045  15046  300  15049 0

c  1-1 --> 0
c    (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0 ∧ -p_300) -> (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧ -b^{30, 11}_0)
c  in CNF:
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_2
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_1
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_0
c  in DIMACS:
 15044  15045 -15046  300 -15047 0
 15044  15045 -15046  300 -15048 0
 15044  15045 -15046  300 -15049 0

c  0-1 --> -1
c    (-b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧ -p_300) -> ( b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0)
c  in CNF:
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨  b^{30, 11}_2
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_1
c     b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨  b^{30, 11}_0
c  in DIMACS:
 15044  15045  15046  300  15047 0
 15044  15045  15046  300 -15048 0
 15044  15045  15046  300  15049 0

c  -1-1 --> -2
c    ( b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧  b^{30, 10}_0 ∧ -p_300) -> ( b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0)
c  in CNF:
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨  b^{30, 11}_2
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨  b^{30, 11}_1
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨  p_300 ∨ -b^{30, 11}_0
c  in DIMACS:
-15044  15045 -15046  300  15047 0
-15044  15045 -15046  300  15048 0
-15044  15045 -15046  300 -15049 0

c  -2-1 --> break 
c    ( b^{30, 10}_2 ∧  b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨  b^{30, 10}_0 ∨  p_300 ∨ break
c  in DIMACS:
-15044 -15045  15046  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 10}_2 ∧ -b^{30, 10}_1 ∧ -b^{30, 10}_0 ∧ true) 
c  in CNF:
c    -b^{30, 10}_2 ∨  b^{30, 10}_1 ∨  b^{30, 10}_0 ∨ false 
c  in DIMACS:
-15044  15045  15046  0

c  3 does not represent an automaton state.
c    -(-b^{30, 10}_2 ∧  b^{30, 10}_1 ∧  b^{30, 10}_0 ∧ true) 
c  in CNF:
c     b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ false 
c  in DIMACS:
 15044 -15045 -15046  0
c  -3 does not represent an automaton state.
c    -( b^{30, 10}_2 ∧  b^{30, 10}_1 ∧  b^{30, 10}_0 ∧ true) 
c  in CNF:
c    -b^{30, 10}_2 ∨ -b^{30, 10}_1 ∨ -b^{30, 10}_0 ∨ false 
c  in DIMACS:
-15044 -15045 -15046  0

c i = 11
c  -2+1 --> -1
c    ( b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧  p_330) -> ( b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0)
c  in CNF:
c    -b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨  b^{30, 12}_2
c    -b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_1
c    -b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨  b^{30, 12}_0
c  in DIMACS:
-15047 -15048  15049 -330  15050 0
-15047 -15048  15049 -330 -15051 0
-15047 -15048  15049 -330  15052 0

c  -1+1 --> 0
c    ( b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0 ∧  p_330) -> (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧ -b^{30, 12}_0)
c  in CNF:
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_2
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_1
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_0
c  in DIMACS:
-15047  15048 -15049 -330 -15050 0
-15047  15048 -15049 -330 -15051 0
-15047  15048 -15049 -330 -15052 0

c  0+1 --> 1
c    (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧  p_330) -> (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0)
c  in CNF:
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_2
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_1
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨  b^{30, 12}_0
c  in DIMACS:
 15047  15048  15049 -330 -15050 0
 15047  15048  15049 -330 -15051 0
 15047  15048  15049 -330  15052 0

c  1+1 --> 2
c    (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0 ∧  p_330) -> (-b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0)
c  in CNF:
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_2
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨  b^{30, 12}_1
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ -p_330 ∨ -b^{30, 12}_0
c  in DIMACS:
 15047  15048 -15049 -330 -15050 0
 15047  15048 -15049 -330  15051 0
 15047  15048 -15049 -330 -15052 0

c  2+1 --> break 
c    (-b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧  p_330) -> break
c  in CNF:
c     b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 15047 -15048  15049 -330 1162 0


c  2-1 --> 1
c    (-b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧ -p_330) -> (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0)
c  in CNF:
c     b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_2
c     b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_1
c     b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨  b^{30, 12}_0
c  in DIMACS:
 15047 -15048  15049  330 -15050 0
 15047 -15048  15049  330 -15051 0
 15047 -15048  15049  330  15052 0

c  1-1 --> 0
c    (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0 ∧ -p_330) -> (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧ -b^{30, 12}_0)
c  in CNF:
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_2
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_1
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_0
c  in DIMACS:
 15047  15048 -15049  330 -15050 0
 15047  15048 -15049  330 -15051 0
 15047  15048 -15049  330 -15052 0

c  0-1 --> -1
c    (-b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧ -p_330) -> ( b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0)
c  in CNF:
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨  b^{30, 12}_2
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_1
c     b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨  b^{30, 12}_0
c  in DIMACS:
 15047  15048  15049  330  15050 0
 15047  15048  15049  330 -15051 0
 15047  15048  15049  330  15052 0

c  -1-1 --> -2
c    ( b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧  b^{30, 11}_0 ∧ -p_330) -> ( b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0)
c  in CNF:
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨  b^{30, 12}_2
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨  b^{30, 12}_1
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨  p_330 ∨ -b^{30, 12}_0
c  in DIMACS:
-15047  15048 -15049  330  15050 0
-15047  15048 -15049  330  15051 0
-15047  15048 -15049  330 -15052 0

c  -2-1 --> break 
c    ( b^{30, 11}_2 ∧  b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨  b^{30, 11}_0 ∨  p_330 ∨ break
c  in DIMACS:
-15047 -15048  15049  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 11}_2 ∧ -b^{30, 11}_1 ∧ -b^{30, 11}_0 ∧ true) 
c  in CNF:
c    -b^{30, 11}_2 ∨  b^{30, 11}_1 ∨  b^{30, 11}_0 ∨ false 
c  in DIMACS:
-15047  15048  15049  0

c  3 does not represent an automaton state.
c    -(-b^{30, 11}_2 ∧  b^{30, 11}_1 ∧  b^{30, 11}_0 ∧ true) 
c  in CNF:
c     b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ false 
c  in DIMACS:
 15047 -15048 -15049  0
c  -3 does not represent an automaton state.
c    -( b^{30, 11}_2 ∧  b^{30, 11}_1 ∧  b^{30, 11}_0 ∧ true) 
c  in CNF:
c    -b^{30, 11}_2 ∨ -b^{30, 11}_1 ∨ -b^{30, 11}_0 ∨ false 
c  in DIMACS:
-15047 -15048 -15049  0

c i = 12
c  -2+1 --> -1
c    ( b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧  p_360) -> ( b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0)
c  in CNF:
c    -b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨  b^{30, 13}_2
c    -b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_1
c    -b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨  b^{30, 13}_0
c  in DIMACS:
-15050 -15051  15052 -360  15053 0
-15050 -15051  15052 -360 -15054 0
-15050 -15051  15052 -360  15055 0

c  -1+1 --> 0
c    ( b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0 ∧  p_360) -> (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧ -b^{30, 13}_0)
c  in CNF:
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_2
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_1
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_0
c  in DIMACS:
-15050  15051 -15052 -360 -15053 0
-15050  15051 -15052 -360 -15054 0
-15050  15051 -15052 -360 -15055 0

c  0+1 --> 1
c    (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧  p_360) -> (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0)
c  in CNF:
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_2
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_1
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨  b^{30, 13}_0
c  in DIMACS:
 15050  15051  15052 -360 -15053 0
 15050  15051  15052 -360 -15054 0
 15050  15051  15052 -360  15055 0

c  1+1 --> 2
c    (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0 ∧  p_360) -> (-b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0)
c  in CNF:
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_2
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨  b^{30, 13}_1
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ -p_360 ∨ -b^{30, 13}_0
c  in DIMACS:
 15050  15051 -15052 -360 -15053 0
 15050  15051 -15052 -360  15054 0
 15050  15051 -15052 -360 -15055 0

c  2+1 --> break 
c    (-b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧  p_360) -> break
c  in CNF:
c     b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 15050 -15051  15052 -360 1162 0


c  2-1 --> 1
c    (-b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧ -p_360) -> (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0)
c  in CNF:
c     b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_2
c     b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_1
c     b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨  b^{30, 13}_0
c  in DIMACS:
 15050 -15051  15052  360 -15053 0
 15050 -15051  15052  360 -15054 0
 15050 -15051  15052  360  15055 0

c  1-1 --> 0
c    (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0 ∧ -p_360) -> (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧ -b^{30, 13}_0)
c  in CNF:
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_2
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_1
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_0
c  in DIMACS:
 15050  15051 -15052  360 -15053 0
 15050  15051 -15052  360 -15054 0
 15050  15051 -15052  360 -15055 0

c  0-1 --> -1
c    (-b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧ -p_360) -> ( b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0)
c  in CNF:
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨  b^{30, 13}_2
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_1
c     b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨  b^{30, 13}_0
c  in DIMACS:
 15050  15051  15052  360  15053 0
 15050  15051  15052  360 -15054 0
 15050  15051  15052  360  15055 0

c  -1-1 --> -2
c    ( b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧  b^{30, 12}_0 ∧ -p_360) -> ( b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0)
c  in CNF:
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨  b^{30, 13}_2
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨  b^{30, 13}_1
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨  p_360 ∨ -b^{30, 13}_0
c  in DIMACS:
-15050  15051 -15052  360  15053 0
-15050  15051 -15052  360  15054 0
-15050  15051 -15052  360 -15055 0

c  -2-1 --> break 
c    ( b^{30, 12}_2 ∧  b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨  b^{30, 12}_0 ∨  p_360 ∨ break
c  in DIMACS:
-15050 -15051  15052  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 12}_2 ∧ -b^{30, 12}_1 ∧ -b^{30, 12}_0 ∧ true) 
c  in CNF:
c    -b^{30, 12}_2 ∨  b^{30, 12}_1 ∨  b^{30, 12}_0 ∨ false 
c  in DIMACS:
-15050  15051  15052  0

c  3 does not represent an automaton state.
c    -(-b^{30, 12}_2 ∧  b^{30, 12}_1 ∧  b^{30, 12}_0 ∧ true) 
c  in CNF:
c     b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ false 
c  in DIMACS:
 15050 -15051 -15052  0
c  -3 does not represent an automaton state.
c    -( b^{30, 12}_2 ∧  b^{30, 12}_1 ∧  b^{30, 12}_0 ∧ true) 
c  in CNF:
c    -b^{30, 12}_2 ∨ -b^{30, 12}_1 ∨ -b^{30, 12}_0 ∨ false 
c  in DIMACS:
-15050 -15051 -15052  0

c i = 13
c  -2+1 --> -1
c    ( b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧  p_390) -> ( b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0)
c  in CNF:
c    -b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨  b^{30, 14}_2
c    -b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_1
c    -b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨  b^{30, 14}_0
c  in DIMACS:
-15053 -15054  15055 -390  15056 0
-15053 -15054  15055 -390 -15057 0
-15053 -15054  15055 -390  15058 0

c  -1+1 --> 0
c    ( b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0 ∧  p_390) -> (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧ -b^{30, 14}_0)
c  in CNF:
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_2
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_1
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_0
c  in DIMACS:
-15053  15054 -15055 -390 -15056 0
-15053  15054 -15055 -390 -15057 0
-15053  15054 -15055 -390 -15058 0

c  0+1 --> 1
c    (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧  p_390) -> (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0)
c  in CNF:
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_2
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_1
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨  b^{30, 14}_0
c  in DIMACS:
 15053  15054  15055 -390 -15056 0
 15053  15054  15055 -390 -15057 0
 15053  15054  15055 -390  15058 0

c  1+1 --> 2
c    (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0 ∧  p_390) -> (-b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0)
c  in CNF:
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_2
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨  b^{30, 14}_1
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ -p_390 ∨ -b^{30, 14}_0
c  in DIMACS:
 15053  15054 -15055 -390 -15056 0
 15053  15054 -15055 -390  15057 0
 15053  15054 -15055 -390 -15058 0

c  2+1 --> break 
c    (-b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧  p_390) -> break
c  in CNF:
c     b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 15053 -15054  15055 -390 1162 0


c  2-1 --> 1
c    (-b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧ -p_390) -> (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0)
c  in CNF:
c     b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_2
c     b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_1
c     b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨  b^{30, 14}_0
c  in DIMACS:
 15053 -15054  15055  390 -15056 0
 15053 -15054  15055  390 -15057 0
 15053 -15054  15055  390  15058 0

c  1-1 --> 0
c    (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0 ∧ -p_390) -> (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧ -b^{30, 14}_0)
c  in CNF:
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_2
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_1
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_0
c  in DIMACS:
 15053  15054 -15055  390 -15056 0
 15053  15054 -15055  390 -15057 0
 15053  15054 -15055  390 -15058 0

c  0-1 --> -1
c    (-b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧ -p_390) -> ( b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0)
c  in CNF:
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨  b^{30, 14}_2
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_1
c     b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨  b^{30, 14}_0
c  in DIMACS:
 15053  15054  15055  390  15056 0
 15053  15054  15055  390 -15057 0
 15053  15054  15055  390  15058 0

c  -1-1 --> -2
c    ( b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧  b^{30, 13}_0 ∧ -p_390) -> ( b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0)
c  in CNF:
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨  b^{30, 14}_2
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨  b^{30, 14}_1
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨  p_390 ∨ -b^{30, 14}_0
c  in DIMACS:
-15053  15054 -15055  390  15056 0
-15053  15054 -15055  390  15057 0
-15053  15054 -15055  390 -15058 0

c  -2-1 --> break 
c    ( b^{30, 13}_2 ∧  b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨  b^{30, 13}_0 ∨  p_390 ∨ break
c  in DIMACS:
-15053 -15054  15055  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 13}_2 ∧ -b^{30, 13}_1 ∧ -b^{30, 13}_0 ∧ true) 
c  in CNF:
c    -b^{30, 13}_2 ∨  b^{30, 13}_1 ∨  b^{30, 13}_0 ∨ false 
c  in DIMACS:
-15053  15054  15055  0

c  3 does not represent an automaton state.
c    -(-b^{30, 13}_2 ∧  b^{30, 13}_1 ∧  b^{30, 13}_0 ∧ true) 
c  in CNF:
c     b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ false 
c  in DIMACS:
 15053 -15054 -15055  0
c  -3 does not represent an automaton state.
c    -( b^{30, 13}_2 ∧  b^{30, 13}_1 ∧  b^{30, 13}_0 ∧ true) 
c  in CNF:
c    -b^{30, 13}_2 ∨ -b^{30, 13}_1 ∨ -b^{30, 13}_0 ∨ false 
c  in DIMACS:
-15053 -15054 -15055  0

c i = 14
c  -2+1 --> -1
c    ( b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧  p_420) -> ( b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0)
c  in CNF:
c    -b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨  b^{30, 15}_2
c    -b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_1
c    -b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨  b^{30, 15}_0
c  in DIMACS:
-15056 -15057  15058 -420  15059 0
-15056 -15057  15058 -420 -15060 0
-15056 -15057  15058 -420  15061 0

c  -1+1 --> 0
c    ( b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0 ∧  p_420) -> (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧ -b^{30, 15}_0)
c  in CNF:
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_2
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_1
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_0
c  in DIMACS:
-15056  15057 -15058 -420 -15059 0
-15056  15057 -15058 -420 -15060 0
-15056  15057 -15058 -420 -15061 0

c  0+1 --> 1
c    (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧  p_420) -> (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0)
c  in CNF:
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_2
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_1
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨  b^{30, 15}_0
c  in DIMACS:
 15056  15057  15058 -420 -15059 0
 15056  15057  15058 -420 -15060 0
 15056  15057  15058 -420  15061 0

c  1+1 --> 2
c    (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0 ∧  p_420) -> (-b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0)
c  in CNF:
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_2
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨  b^{30, 15}_1
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ -p_420 ∨ -b^{30, 15}_0
c  in DIMACS:
 15056  15057 -15058 -420 -15059 0
 15056  15057 -15058 -420  15060 0
 15056  15057 -15058 -420 -15061 0

c  2+1 --> break 
c    (-b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧  p_420) -> break
c  in CNF:
c     b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 15056 -15057  15058 -420 1162 0


c  2-1 --> 1
c    (-b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧ -p_420) -> (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0)
c  in CNF:
c     b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_2
c     b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_1
c     b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨  b^{30, 15}_0
c  in DIMACS:
 15056 -15057  15058  420 -15059 0
 15056 -15057  15058  420 -15060 0
 15056 -15057  15058  420  15061 0

c  1-1 --> 0
c    (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0 ∧ -p_420) -> (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧ -b^{30, 15}_0)
c  in CNF:
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_2
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_1
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_0
c  in DIMACS:
 15056  15057 -15058  420 -15059 0
 15056  15057 -15058  420 -15060 0
 15056  15057 -15058  420 -15061 0

c  0-1 --> -1
c    (-b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧ -p_420) -> ( b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0)
c  in CNF:
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨  b^{30, 15}_2
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_1
c     b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨  b^{30, 15}_0
c  in DIMACS:
 15056  15057  15058  420  15059 0
 15056  15057  15058  420 -15060 0
 15056  15057  15058  420  15061 0

c  -1-1 --> -2
c    ( b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧  b^{30, 14}_0 ∧ -p_420) -> ( b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0)
c  in CNF:
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨  b^{30, 15}_2
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨  b^{30, 15}_1
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨  p_420 ∨ -b^{30, 15}_0
c  in DIMACS:
-15056  15057 -15058  420  15059 0
-15056  15057 -15058  420  15060 0
-15056  15057 -15058  420 -15061 0

c  -2-1 --> break 
c    ( b^{30, 14}_2 ∧  b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨  b^{30, 14}_0 ∨  p_420 ∨ break
c  in DIMACS:
-15056 -15057  15058  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 14}_2 ∧ -b^{30, 14}_1 ∧ -b^{30, 14}_0 ∧ true) 
c  in CNF:
c    -b^{30, 14}_2 ∨  b^{30, 14}_1 ∨  b^{30, 14}_0 ∨ false 
c  in DIMACS:
-15056  15057  15058  0

c  3 does not represent an automaton state.
c    -(-b^{30, 14}_2 ∧  b^{30, 14}_1 ∧  b^{30, 14}_0 ∧ true) 
c  in CNF:
c     b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ false 
c  in DIMACS:
 15056 -15057 -15058  0
c  -3 does not represent an automaton state.
c    -( b^{30, 14}_2 ∧  b^{30, 14}_1 ∧  b^{30, 14}_0 ∧ true) 
c  in CNF:
c    -b^{30, 14}_2 ∨ -b^{30, 14}_1 ∨ -b^{30, 14}_0 ∨ false 
c  in DIMACS:
-15056 -15057 -15058  0

c i = 15
c  -2+1 --> -1
c    ( b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧  p_450) -> ( b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0)
c  in CNF:
c    -b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨  b^{30, 16}_2
c    -b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_1
c    -b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨  b^{30, 16}_0
c  in DIMACS:
-15059 -15060  15061 -450  15062 0
-15059 -15060  15061 -450 -15063 0
-15059 -15060  15061 -450  15064 0

c  -1+1 --> 0
c    ( b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0 ∧  p_450) -> (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧ -b^{30, 16}_0)
c  in CNF:
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_2
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_1
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_0
c  in DIMACS:
-15059  15060 -15061 -450 -15062 0
-15059  15060 -15061 -450 -15063 0
-15059  15060 -15061 -450 -15064 0

c  0+1 --> 1
c    (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧  p_450) -> (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0)
c  in CNF:
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_2
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_1
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨  b^{30, 16}_0
c  in DIMACS:
 15059  15060  15061 -450 -15062 0
 15059  15060  15061 -450 -15063 0
 15059  15060  15061 -450  15064 0

c  1+1 --> 2
c    (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0 ∧  p_450) -> (-b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0)
c  in CNF:
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_2
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨  b^{30, 16}_1
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ -p_450 ∨ -b^{30, 16}_0
c  in DIMACS:
 15059  15060 -15061 -450 -15062 0
 15059  15060 -15061 -450  15063 0
 15059  15060 -15061 -450 -15064 0

c  2+1 --> break 
c    (-b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧  p_450) -> break
c  in CNF:
c     b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 15059 -15060  15061 -450 1162 0


c  2-1 --> 1
c    (-b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧ -p_450) -> (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0)
c  in CNF:
c     b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_2
c     b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_1
c     b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨  b^{30, 16}_0
c  in DIMACS:
 15059 -15060  15061  450 -15062 0
 15059 -15060  15061  450 -15063 0
 15059 -15060  15061  450  15064 0

c  1-1 --> 0
c    (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0 ∧ -p_450) -> (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧ -b^{30, 16}_0)
c  in CNF:
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_2
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_1
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_0
c  in DIMACS:
 15059  15060 -15061  450 -15062 0
 15059  15060 -15061  450 -15063 0
 15059  15060 -15061  450 -15064 0

c  0-1 --> -1
c    (-b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧ -p_450) -> ( b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0)
c  in CNF:
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨  b^{30, 16}_2
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_1
c     b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨  b^{30, 16}_0
c  in DIMACS:
 15059  15060  15061  450  15062 0
 15059  15060  15061  450 -15063 0
 15059  15060  15061  450  15064 0

c  -1-1 --> -2
c    ( b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧  b^{30, 15}_0 ∧ -p_450) -> ( b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0)
c  in CNF:
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨  b^{30, 16}_2
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨  b^{30, 16}_1
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨  p_450 ∨ -b^{30, 16}_0
c  in DIMACS:
-15059  15060 -15061  450  15062 0
-15059  15060 -15061  450  15063 0
-15059  15060 -15061  450 -15064 0

c  -2-1 --> break 
c    ( b^{30, 15}_2 ∧  b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨  b^{30, 15}_0 ∨  p_450 ∨ break
c  in DIMACS:
-15059 -15060  15061  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 15}_2 ∧ -b^{30, 15}_1 ∧ -b^{30, 15}_0 ∧ true) 
c  in CNF:
c    -b^{30, 15}_2 ∨  b^{30, 15}_1 ∨  b^{30, 15}_0 ∨ false 
c  in DIMACS:
-15059  15060  15061  0

c  3 does not represent an automaton state.
c    -(-b^{30, 15}_2 ∧  b^{30, 15}_1 ∧  b^{30, 15}_0 ∧ true) 
c  in CNF:
c     b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ false 
c  in DIMACS:
 15059 -15060 -15061  0
c  -3 does not represent an automaton state.
c    -( b^{30, 15}_2 ∧  b^{30, 15}_1 ∧  b^{30, 15}_0 ∧ true) 
c  in CNF:
c    -b^{30, 15}_2 ∨ -b^{30, 15}_1 ∨ -b^{30, 15}_0 ∨ false 
c  in DIMACS:
-15059 -15060 -15061  0

c i = 16
c  -2+1 --> -1
c    ( b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧  p_480) -> ( b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0)
c  in CNF:
c    -b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨  b^{30, 17}_2
c    -b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_1
c    -b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨  b^{30, 17}_0
c  in DIMACS:
-15062 -15063  15064 -480  15065 0
-15062 -15063  15064 -480 -15066 0
-15062 -15063  15064 -480  15067 0

c  -1+1 --> 0
c    ( b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0 ∧  p_480) -> (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧ -b^{30, 17}_0)
c  in CNF:
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_2
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_1
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_0
c  in DIMACS:
-15062  15063 -15064 -480 -15065 0
-15062  15063 -15064 -480 -15066 0
-15062  15063 -15064 -480 -15067 0

c  0+1 --> 1
c    (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧  p_480) -> (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0)
c  in CNF:
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_2
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_1
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨  b^{30, 17}_0
c  in DIMACS:
 15062  15063  15064 -480 -15065 0
 15062  15063  15064 -480 -15066 0
 15062  15063  15064 -480  15067 0

c  1+1 --> 2
c    (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0 ∧  p_480) -> (-b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0)
c  in CNF:
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_2
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨  b^{30, 17}_1
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ -p_480 ∨ -b^{30, 17}_0
c  in DIMACS:
 15062  15063 -15064 -480 -15065 0
 15062  15063 -15064 -480  15066 0
 15062  15063 -15064 -480 -15067 0

c  2+1 --> break 
c    (-b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧  p_480) -> break
c  in CNF:
c     b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 15062 -15063  15064 -480 1162 0


c  2-1 --> 1
c    (-b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧ -p_480) -> (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0)
c  in CNF:
c     b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_2
c     b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_1
c     b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨  b^{30, 17}_0
c  in DIMACS:
 15062 -15063  15064  480 -15065 0
 15062 -15063  15064  480 -15066 0
 15062 -15063  15064  480  15067 0

c  1-1 --> 0
c    (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0 ∧ -p_480) -> (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧ -b^{30, 17}_0)
c  in CNF:
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_2
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_1
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_0
c  in DIMACS:
 15062  15063 -15064  480 -15065 0
 15062  15063 -15064  480 -15066 0
 15062  15063 -15064  480 -15067 0

c  0-1 --> -1
c    (-b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧ -p_480) -> ( b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0)
c  in CNF:
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨  b^{30, 17}_2
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_1
c     b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨  b^{30, 17}_0
c  in DIMACS:
 15062  15063  15064  480  15065 0
 15062  15063  15064  480 -15066 0
 15062  15063  15064  480  15067 0

c  -1-1 --> -2
c    ( b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧  b^{30, 16}_0 ∧ -p_480) -> ( b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0)
c  in CNF:
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨  b^{30, 17}_2
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨  b^{30, 17}_1
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨  p_480 ∨ -b^{30, 17}_0
c  in DIMACS:
-15062  15063 -15064  480  15065 0
-15062  15063 -15064  480  15066 0
-15062  15063 -15064  480 -15067 0

c  -2-1 --> break 
c    ( b^{30, 16}_2 ∧  b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨  b^{30, 16}_0 ∨  p_480 ∨ break
c  in DIMACS:
-15062 -15063  15064  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 16}_2 ∧ -b^{30, 16}_1 ∧ -b^{30, 16}_0 ∧ true) 
c  in CNF:
c    -b^{30, 16}_2 ∨  b^{30, 16}_1 ∨  b^{30, 16}_0 ∨ false 
c  in DIMACS:
-15062  15063  15064  0

c  3 does not represent an automaton state.
c    -(-b^{30, 16}_2 ∧  b^{30, 16}_1 ∧  b^{30, 16}_0 ∧ true) 
c  in CNF:
c     b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ false 
c  in DIMACS:
 15062 -15063 -15064  0
c  -3 does not represent an automaton state.
c    -( b^{30, 16}_2 ∧  b^{30, 16}_1 ∧  b^{30, 16}_0 ∧ true) 
c  in CNF:
c    -b^{30, 16}_2 ∨ -b^{30, 16}_1 ∨ -b^{30, 16}_0 ∨ false 
c  in DIMACS:
-15062 -15063 -15064  0

c i = 17
c  -2+1 --> -1
c    ( b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧  p_510) -> ( b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0)
c  in CNF:
c    -b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨  b^{30, 18}_2
c    -b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_1
c    -b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨  b^{30, 18}_0
c  in DIMACS:
-15065 -15066  15067 -510  15068 0
-15065 -15066  15067 -510 -15069 0
-15065 -15066  15067 -510  15070 0

c  -1+1 --> 0
c    ( b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0 ∧  p_510) -> (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧ -b^{30, 18}_0)
c  in CNF:
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_2
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_1
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_0
c  in DIMACS:
-15065  15066 -15067 -510 -15068 0
-15065  15066 -15067 -510 -15069 0
-15065  15066 -15067 -510 -15070 0

c  0+1 --> 1
c    (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧  p_510) -> (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0)
c  in CNF:
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_2
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_1
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨  b^{30, 18}_0
c  in DIMACS:
 15065  15066  15067 -510 -15068 0
 15065  15066  15067 -510 -15069 0
 15065  15066  15067 -510  15070 0

c  1+1 --> 2
c    (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0 ∧  p_510) -> (-b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0)
c  in CNF:
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_2
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨  b^{30, 18}_1
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ -p_510 ∨ -b^{30, 18}_0
c  in DIMACS:
 15065  15066 -15067 -510 -15068 0
 15065  15066 -15067 -510  15069 0
 15065  15066 -15067 -510 -15070 0

c  2+1 --> break 
c    (-b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧  p_510) -> break
c  in CNF:
c     b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 15065 -15066  15067 -510 1162 0


c  2-1 --> 1
c    (-b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧ -p_510) -> (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0)
c  in CNF:
c     b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_2
c     b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_1
c     b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨  b^{30, 18}_0
c  in DIMACS:
 15065 -15066  15067  510 -15068 0
 15065 -15066  15067  510 -15069 0
 15065 -15066  15067  510  15070 0

c  1-1 --> 0
c    (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0 ∧ -p_510) -> (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧ -b^{30, 18}_0)
c  in CNF:
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_2
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_1
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_0
c  in DIMACS:
 15065  15066 -15067  510 -15068 0
 15065  15066 -15067  510 -15069 0
 15065  15066 -15067  510 -15070 0

c  0-1 --> -1
c    (-b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧ -p_510) -> ( b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0)
c  in CNF:
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨  b^{30, 18}_2
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_1
c     b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨  b^{30, 18}_0
c  in DIMACS:
 15065  15066  15067  510  15068 0
 15065  15066  15067  510 -15069 0
 15065  15066  15067  510  15070 0

c  -1-1 --> -2
c    ( b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧  b^{30, 17}_0 ∧ -p_510) -> ( b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0)
c  in CNF:
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨  b^{30, 18}_2
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨  b^{30, 18}_1
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨  p_510 ∨ -b^{30, 18}_0
c  in DIMACS:
-15065  15066 -15067  510  15068 0
-15065  15066 -15067  510  15069 0
-15065  15066 -15067  510 -15070 0

c  -2-1 --> break 
c    ( b^{30, 17}_2 ∧  b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨  b^{30, 17}_0 ∨  p_510 ∨ break
c  in DIMACS:
-15065 -15066  15067  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 17}_2 ∧ -b^{30, 17}_1 ∧ -b^{30, 17}_0 ∧ true) 
c  in CNF:
c    -b^{30, 17}_2 ∨  b^{30, 17}_1 ∨  b^{30, 17}_0 ∨ false 
c  in DIMACS:
-15065  15066  15067  0

c  3 does not represent an automaton state.
c    -(-b^{30, 17}_2 ∧  b^{30, 17}_1 ∧  b^{30, 17}_0 ∧ true) 
c  in CNF:
c     b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ false 
c  in DIMACS:
 15065 -15066 -15067  0
c  -3 does not represent an automaton state.
c    -( b^{30, 17}_2 ∧  b^{30, 17}_1 ∧  b^{30, 17}_0 ∧ true) 
c  in CNF:
c    -b^{30, 17}_2 ∨ -b^{30, 17}_1 ∨ -b^{30, 17}_0 ∨ false 
c  in DIMACS:
-15065 -15066 -15067  0

c i = 18
c  -2+1 --> -1
c    ( b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧  p_540) -> ( b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0)
c  in CNF:
c    -b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨  b^{30, 19}_2
c    -b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_1
c    -b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨  b^{30, 19}_0
c  in DIMACS:
-15068 -15069  15070 -540  15071 0
-15068 -15069  15070 -540 -15072 0
-15068 -15069  15070 -540  15073 0

c  -1+1 --> 0
c    ( b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0 ∧  p_540) -> (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧ -b^{30, 19}_0)
c  in CNF:
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_2
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_1
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_0
c  in DIMACS:
-15068  15069 -15070 -540 -15071 0
-15068  15069 -15070 -540 -15072 0
-15068  15069 -15070 -540 -15073 0

c  0+1 --> 1
c    (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧  p_540) -> (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0)
c  in CNF:
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_2
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_1
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨  b^{30, 19}_0
c  in DIMACS:
 15068  15069  15070 -540 -15071 0
 15068  15069  15070 -540 -15072 0
 15068  15069  15070 -540  15073 0

c  1+1 --> 2
c    (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0 ∧  p_540) -> (-b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0)
c  in CNF:
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_2
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨  b^{30, 19}_1
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ -p_540 ∨ -b^{30, 19}_0
c  in DIMACS:
 15068  15069 -15070 -540 -15071 0
 15068  15069 -15070 -540  15072 0
 15068  15069 -15070 -540 -15073 0

c  2+1 --> break 
c    (-b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧  p_540) -> break
c  in CNF:
c     b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 15068 -15069  15070 -540 1162 0


c  2-1 --> 1
c    (-b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧ -p_540) -> (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0)
c  in CNF:
c     b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_2
c     b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_1
c     b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨  b^{30, 19}_0
c  in DIMACS:
 15068 -15069  15070  540 -15071 0
 15068 -15069  15070  540 -15072 0
 15068 -15069  15070  540  15073 0

c  1-1 --> 0
c    (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0 ∧ -p_540) -> (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧ -b^{30, 19}_0)
c  in CNF:
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_2
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_1
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_0
c  in DIMACS:
 15068  15069 -15070  540 -15071 0
 15068  15069 -15070  540 -15072 0
 15068  15069 -15070  540 -15073 0

c  0-1 --> -1
c    (-b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧ -p_540) -> ( b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0)
c  in CNF:
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨  b^{30, 19}_2
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_1
c     b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨  b^{30, 19}_0
c  in DIMACS:
 15068  15069  15070  540  15071 0
 15068  15069  15070  540 -15072 0
 15068  15069  15070  540  15073 0

c  -1-1 --> -2
c    ( b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧  b^{30, 18}_0 ∧ -p_540) -> ( b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0)
c  in CNF:
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨  b^{30, 19}_2
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨  b^{30, 19}_1
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨  p_540 ∨ -b^{30, 19}_0
c  in DIMACS:
-15068  15069 -15070  540  15071 0
-15068  15069 -15070  540  15072 0
-15068  15069 -15070  540 -15073 0

c  -2-1 --> break 
c    ( b^{30, 18}_2 ∧  b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨  b^{30, 18}_0 ∨  p_540 ∨ break
c  in DIMACS:
-15068 -15069  15070  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 18}_2 ∧ -b^{30, 18}_1 ∧ -b^{30, 18}_0 ∧ true) 
c  in CNF:
c    -b^{30, 18}_2 ∨  b^{30, 18}_1 ∨  b^{30, 18}_0 ∨ false 
c  in DIMACS:
-15068  15069  15070  0

c  3 does not represent an automaton state.
c    -(-b^{30, 18}_2 ∧  b^{30, 18}_1 ∧  b^{30, 18}_0 ∧ true) 
c  in CNF:
c     b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ false 
c  in DIMACS:
 15068 -15069 -15070  0
c  -3 does not represent an automaton state.
c    -( b^{30, 18}_2 ∧  b^{30, 18}_1 ∧  b^{30, 18}_0 ∧ true) 
c  in CNF:
c    -b^{30, 18}_2 ∨ -b^{30, 18}_1 ∨ -b^{30, 18}_0 ∨ false 
c  in DIMACS:
-15068 -15069 -15070  0

c i = 19
c  -2+1 --> -1
c    ( b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧  p_570) -> ( b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0)
c  in CNF:
c    -b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨  b^{30, 20}_2
c    -b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_1
c    -b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨  b^{30, 20}_0
c  in DIMACS:
-15071 -15072  15073 -570  15074 0
-15071 -15072  15073 -570 -15075 0
-15071 -15072  15073 -570  15076 0

c  -1+1 --> 0
c    ( b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0 ∧  p_570) -> (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧ -b^{30, 20}_0)
c  in CNF:
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_2
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_1
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_0
c  in DIMACS:
-15071  15072 -15073 -570 -15074 0
-15071  15072 -15073 -570 -15075 0
-15071  15072 -15073 -570 -15076 0

c  0+1 --> 1
c    (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧  p_570) -> (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0)
c  in CNF:
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_2
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_1
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨  b^{30, 20}_0
c  in DIMACS:
 15071  15072  15073 -570 -15074 0
 15071  15072  15073 -570 -15075 0
 15071  15072  15073 -570  15076 0

c  1+1 --> 2
c    (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0 ∧  p_570) -> (-b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0)
c  in CNF:
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_2
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨  b^{30, 20}_1
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ -p_570 ∨ -b^{30, 20}_0
c  in DIMACS:
 15071  15072 -15073 -570 -15074 0
 15071  15072 -15073 -570  15075 0
 15071  15072 -15073 -570 -15076 0

c  2+1 --> break 
c    (-b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧  p_570) -> break
c  in CNF:
c     b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 15071 -15072  15073 -570 1162 0


c  2-1 --> 1
c    (-b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧ -p_570) -> (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0)
c  in CNF:
c     b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_2
c     b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_1
c     b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨  b^{30, 20}_0
c  in DIMACS:
 15071 -15072  15073  570 -15074 0
 15071 -15072  15073  570 -15075 0
 15071 -15072  15073  570  15076 0

c  1-1 --> 0
c    (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0 ∧ -p_570) -> (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧ -b^{30, 20}_0)
c  in CNF:
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_2
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_1
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_0
c  in DIMACS:
 15071  15072 -15073  570 -15074 0
 15071  15072 -15073  570 -15075 0
 15071  15072 -15073  570 -15076 0

c  0-1 --> -1
c    (-b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧ -p_570) -> ( b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0)
c  in CNF:
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨  b^{30, 20}_2
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_1
c     b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨  b^{30, 20}_0
c  in DIMACS:
 15071  15072  15073  570  15074 0
 15071  15072  15073  570 -15075 0
 15071  15072  15073  570  15076 0

c  -1-1 --> -2
c    ( b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧  b^{30, 19}_0 ∧ -p_570) -> ( b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0)
c  in CNF:
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨  b^{30, 20}_2
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨  b^{30, 20}_1
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨  p_570 ∨ -b^{30, 20}_0
c  in DIMACS:
-15071  15072 -15073  570  15074 0
-15071  15072 -15073  570  15075 0
-15071  15072 -15073  570 -15076 0

c  -2-1 --> break 
c    ( b^{30, 19}_2 ∧  b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨  b^{30, 19}_0 ∨  p_570 ∨ break
c  in DIMACS:
-15071 -15072  15073  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 19}_2 ∧ -b^{30, 19}_1 ∧ -b^{30, 19}_0 ∧ true) 
c  in CNF:
c    -b^{30, 19}_2 ∨  b^{30, 19}_1 ∨  b^{30, 19}_0 ∨ false 
c  in DIMACS:
-15071  15072  15073  0

c  3 does not represent an automaton state.
c    -(-b^{30, 19}_2 ∧  b^{30, 19}_1 ∧  b^{30, 19}_0 ∧ true) 
c  in CNF:
c     b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ false 
c  in DIMACS:
 15071 -15072 -15073  0
c  -3 does not represent an automaton state.
c    -( b^{30, 19}_2 ∧  b^{30, 19}_1 ∧  b^{30, 19}_0 ∧ true) 
c  in CNF:
c    -b^{30, 19}_2 ∨ -b^{30, 19}_1 ∨ -b^{30, 19}_0 ∨ false 
c  in DIMACS:
-15071 -15072 -15073  0

c i = 20
c  -2+1 --> -1
c    ( b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧  p_600) -> ( b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0)
c  in CNF:
c    -b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨  b^{30, 21}_2
c    -b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_1
c    -b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨  b^{30, 21}_0
c  in DIMACS:
-15074 -15075  15076 -600  15077 0
-15074 -15075  15076 -600 -15078 0
-15074 -15075  15076 -600  15079 0

c  -1+1 --> 0
c    ( b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0 ∧  p_600) -> (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧ -b^{30, 21}_0)
c  in CNF:
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_2
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_1
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_0
c  in DIMACS:
-15074  15075 -15076 -600 -15077 0
-15074  15075 -15076 -600 -15078 0
-15074  15075 -15076 -600 -15079 0

c  0+1 --> 1
c    (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧  p_600) -> (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0)
c  in CNF:
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_2
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_1
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨  b^{30, 21}_0
c  in DIMACS:
 15074  15075  15076 -600 -15077 0
 15074  15075  15076 -600 -15078 0
 15074  15075  15076 -600  15079 0

c  1+1 --> 2
c    (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0 ∧  p_600) -> (-b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0)
c  in CNF:
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_2
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨  b^{30, 21}_1
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ -p_600 ∨ -b^{30, 21}_0
c  in DIMACS:
 15074  15075 -15076 -600 -15077 0
 15074  15075 -15076 -600  15078 0
 15074  15075 -15076 -600 -15079 0

c  2+1 --> break 
c    (-b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧  p_600) -> break
c  in CNF:
c     b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 15074 -15075  15076 -600 1162 0


c  2-1 --> 1
c    (-b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧ -p_600) -> (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0)
c  in CNF:
c     b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_2
c     b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_1
c     b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨  b^{30, 21}_0
c  in DIMACS:
 15074 -15075  15076  600 -15077 0
 15074 -15075  15076  600 -15078 0
 15074 -15075  15076  600  15079 0

c  1-1 --> 0
c    (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0 ∧ -p_600) -> (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧ -b^{30, 21}_0)
c  in CNF:
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_2
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_1
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_0
c  in DIMACS:
 15074  15075 -15076  600 -15077 0
 15074  15075 -15076  600 -15078 0
 15074  15075 -15076  600 -15079 0

c  0-1 --> -1
c    (-b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧ -p_600) -> ( b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0)
c  in CNF:
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨  b^{30, 21}_2
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_1
c     b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨  b^{30, 21}_0
c  in DIMACS:
 15074  15075  15076  600  15077 0
 15074  15075  15076  600 -15078 0
 15074  15075  15076  600  15079 0

c  -1-1 --> -2
c    ( b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧  b^{30, 20}_0 ∧ -p_600) -> ( b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0)
c  in CNF:
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨  b^{30, 21}_2
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨  b^{30, 21}_1
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨  p_600 ∨ -b^{30, 21}_0
c  in DIMACS:
-15074  15075 -15076  600  15077 0
-15074  15075 -15076  600  15078 0
-15074  15075 -15076  600 -15079 0

c  -2-1 --> break 
c    ( b^{30, 20}_2 ∧  b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨  b^{30, 20}_0 ∨  p_600 ∨ break
c  in DIMACS:
-15074 -15075  15076  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 20}_2 ∧ -b^{30, 20}_1 ∧ -b^{30, 20}_0 ∧ true) 
c  in CNF:
c    -b^{30, 20}_2 ∨  b^{30, 20}_1 ∨  b^{30, 20}_0 ∨ false 
c  in DIMACS:
-15074  15075  15076  0

c  3 does not represent an automaton state.
c    -(-b^{30, 20}_2 ∧  b^{30, 20}_1 ∧  b^{30, 20}_0 ∧ true) 
c  in CNF:
c     b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ false 
c  in DIMACS:
 15074 -15075 -15076  0
c  -3 does not represent an automaton state.
c    -( b^{30, 20}_2 ∧  b^{30, 20}_1 ∧  b^{30, 20}_0 ∧ true) 
c  in CNF:
c    -b^{30, 20}_2 ∨ -b^{30, 20}_1 ∨ -b^{30, 20}_0 ∨ false 
c  in DIMACS:
-15074 -15075 -15076  0

c i = 21
c  -2+1 --> -1
c    ( b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧  p_630) -> ( b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0)
c  in CNF:
c    -b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨  b^{30, 22}_2
c    -b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_1
c    -b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨  b^{30, 22}_0
c  in DIMACS:
-15077 -15078  15079 -630  15080 0
-15077 -15078  15079 -630 -15081 0
-15077 -15078  15079 -630  15082 0

c  -1+1 --> 0
c    ( b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0 ∧  p_630) -> (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧ -b^{30, 22}_0)
c  in CNF:
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_2
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_1
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_0
c  in DIMACS:
-15077  15078 -15079 -630 -15080 0
-15077  15078 -15079 -630 -15081 0
-15077  15078 -15079 -630 -15082 0

c  0+1 --> 1
c    (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧  p_630) -> (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0)
c  in CNF:
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_2
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_1
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨  b^{30, 22}_0
c  in DIMACS:
 15077  15078  15079 -630 -15080 0
 15077  15078  15079 -630 -15081 0
 15077  15078  15079 -630  15082 0

c  1+1 --> 2
c    (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0 ∧  p_630) -> (-b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0)
c  in CNF:
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_2
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨  b^{30, 22}_1
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ -p_630 ∨ -b^{30, 22}_0
c  in DIMACS:
 15077  15078 -15079 -630 -15080 0
 15077  15078 -15079 -630  15081 0
 15077  15078 -15079 -630 -15082 0

c  2+1 --> break 
c    (-b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧  p_630) -> break
c  in CNF:
c     b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 15077 -15078  15079 -630 1162 0


c  2-1 --> 1
c    (-b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧ -p_630) -> (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0)
c  in CNF:
c     b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_2
c     b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_1
c     b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨  b^{30, 22}_0
c  in DIMACS:
 15077 -15078  15079  630 -15080 0
 15077 -15078  15079  630 -15081 0
 15077 -15078  15079  630  15082 0

c  1-1 --> 0
c    (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0 ∧ -p_630) -> (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧ -b^{30, 22}_0)
c  in CNF:
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_2
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_1
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_0
c  in DIMACS:
 15077  15078 -15079  630 -15080 0
 15077  15078 -15079  630 -15081 0
 15077  15078 -15079  630 -15082 0

c  0-1 --> -1
c    (-b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧ -p_630) -> ( b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0)
c  in CNF:
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨  b^{30, 22}_2
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_1
c     b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨  b^{30, 22}_0
c  in DIMACS:
 15077  15078  15079  630  15080 0
 15077  15078  15079  630 -15081 0
 15077  15078  15079  630  15082 0

c  -1-1 --> -2
c    ( b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧  b^{30, 21}_0 ∧ -p_630) -> ( b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0)
c  in CNF:
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨  b^{30, 22}_2
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨  b^{30, 22}_1
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨  p_630 ∨ -b^{30, 22}_0
c  in DIMACS:
-15077  15078 -15079  630  15080 0
-15077  15078 -15079  630  15081 0
-15077  15078 -15079  630 -15082 0

c  -2-1 --> break 
c    ( b^{30, 21}_2 ∧  b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨  b^{30, 21}_0 ∨  p_630 ∨ break
c  in DIMACS:
-15077 -15078  15079  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 21}_2 ∧ -b^{30, 21}_1 ∧ -b^{30, 21}_0 ∧ true) 
c  in CNF:
c    -b^{30, 21}_2 ∨  b^{30, 21}_1 ∨  b^{30, 21}_0 ∨ false 
c  in DIMACS:
-15077  15078  15079  0

c  3 does not represent an automaton state.
c    -(-b^{30, 21}_2 ∧  b^{30, 21}_1 ∧  b^{30, 21}_0 ∧ true) 
c  in CNF:
c     b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ false 
c  in DIMACS:
 15077 -15078 -15079  0
c  -3 does not represent an automaton state.
c    -( b^{30, 21}_2 ∧  b^{30, 21}_1 ∧  b^{30, 21}_0 ∧ true) 
c  in CNF:
c    -b^{30, 21}_2 ∨ -b^{30, 21}_1 ∨ -b^{30, 21}_0 ∨ false 
c  in DIMACS:
-15077 -15078 -15079  0

c i = 22
c  -2+1 --> -1
c    ( b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧  p_660) -> ( b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0)
c  in CNF:
c    -b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨  b^{30, 23}_2
c    -b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_1
c    -b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨  b^{30, 23}_0
c  in DIMACS:
-15080 -15081  15082 -660  15083 0
-15080 -15081  15082 -660 -15084 0
-15080 -15081  15082 -660  15085 0

c  -1+1 --> 0
c    ( b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0 ∧  p_660) -> (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧ -b^{30, 23}_0)
c  in CNF:
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_2
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_1
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_0
c  in DIMACS:
-15080  15081 -15082 -660 -15083 0
-15080  15081 -15082 -660 -15084 0
-15080  15081 -15082 -660 -15085 0

c  0+1 --> 1
c    (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧  p_660) -> (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0)
c  in CNF:
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_2
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_1
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨  b^{30, 23}_0
c  in DIMACS:
 15080  15081  15082 -660 -15083 0
 15080  15081  15082 -660 -15084 0
 15080  15081  15082 -660  15085 0

c  1+1 --> 2
c    (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0 ∧  p_660) -> (-b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0)
c  in CNF:
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_2
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨  b^{30, 23}_1
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ -p_660 ∨ -b^{30, 23}_0
c  in DIMACS:
 15080  15081 -15082 -660 -15083 0
 15080  15081 -15082 -660  15084 0
 15080  15081 -15082 -660 -15085 0

c  2+1 --> break 
c    (-b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧  p_660) -> break
c  in CNF:
c     b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 15080 -15081  15082 -660 1162 0


c  2-1 --> 1
c    (-b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧ -p_660) -> (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0)
c  in CNF:
c     b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_2
c     b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_1
c     b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨  b^{30, 23}_0
c  in DIMACS:
 15080 -15081  15082  660 -15083 0
 15080 -15081  15082  660 -15084 0
 15080 -15081  15082  660  15085 0

c  1-1 --> 0
c    (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0 ∧ -p_660) -> (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧ -b^{30, 23}_0)
c  in CNF:
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_2
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_1
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_0
c  in DIMACS:
 15080  15081 -15082  660 -15083 0
 15080  15081 -15082  660 -15084 0
 15080  15081 -15082  660 -15085 0

c  0-1 --> -1
c    (-b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧ -p_660) -> ( b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0)
c  in CNF:
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨  b^{30, 23}_2
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_1
c     b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨  b^{30, 23}_0
c  in DIMACS:
 15080  15081  15082  660  15083 0
 15080  15081  15082  660 -15084 0
 15080  15081  15082  660  15085 0

c  -1-1 --> -2
c    ( b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧  b^{30, 22}_0 ∧ -p_660) -> ( b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0)
c  in CNF:
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨  b^{30, 23}_2
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨  b^{30, 23}_1
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨  p_660 ∨ -b^{30, 23}_0
c  in DIMACS:
-15080  15081 -15082  660  15083 0
-15080  15081 -15082  660  15084 0
-15080  15081 -15082  660 -15085 0

c  -2-1 --> break 
c    ( b^{30, 22}_2 ∧  b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨  b^{30, 22}_0 ∨  p_660 ∨ break
c  in DIMACS:
-15080 -15081  15082  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 22}_2 ∧ -b^{30, 22}_1 ∧ -b^{30, 22}_0 ∧ true) 
c  in CNF:
c    -b^{30, 22}_2 ∨  b^{30, 22}_1 ∨  b^{30, 22}_0 ∨ false 
c  in DIMACS:
-15080  15081  15082  0

c  3 does not represent an automaton state.
c    -(-b^{30, 22}_2 ∧  b^{30, 22}_1 ∧  b^{30, 22}_0 ∧ true) 
c  in CNF:
c     b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ false 
c  in DIMACS:
 15080 -15081 -15082  0
c  -3 does not represent an automaton state.
c    -( b^{30, 22}_2 ∧  b^{30, 22}_1 ∧  b^{30, 22}_0 ∧ true) 
c  in CNF:
c    -b^{30, 22}_2 ∨ -b^{30, 22}_1 ∨ -b^{30, 22}_0 ∨ false 
c  in DIMACS:
-15080 -15081 -15082  0

c i = 23
c  -2+1 --> -1
c    ( b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧  p_690) -> ( b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0)
c  in CNF:
c    -b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨  b^{30, 24}_2
c    -b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_1
c    -b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨  b^{30, 24}_0
c  in DIMACS:
-15083 -15084  15085 -690  15086 0
-15083 -15084  15085 -690 -15087 0
-15083 -15084  15085 -690  15088 0

c  -1+1 --> 0
c    ( b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0 ∧  p_690) -> (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧ -b^{30, 24}_0)
c  in CNF:
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_2
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_1
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_0
c  in DIMACS:
-15083  15084 -15085 -690 -15086 0
-15083  15084 -15085 -690 -15087 0
-15083  15084 -15085 -690 -15088 0

c  0+1 --> 1
c    (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧  p_690) -> (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0)
c  in CNF:
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_2
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_1
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨  b^{30, 24}_0
c  in DIMACS:
 15083  15084  15085 -690 -15086 0
 15083  15084  15085 -690 -15087 0
 15083  15084  15085 -690  15088 0

c  1+1 --> 2
c    (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0 ∧  p_690) -> (-b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0)
c  in CNF:
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_2
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨  b^{30, 24}_1
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ -p_690 ∨ -b^{30, 24}_0
c  in DIMACS:
 15083  15084 -15085 -690 -15086 0
 15083  15084 -15085 -690  15087 0
 15083  15084 -15085 -690 -15088 0

c  2+1 --> break 
c    (-b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧  p_690) -> break
c  in CNF:
c     b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 15083 -15084  15085 -690 1162 0


c  2-1 --> 1
c    (-b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧ -p_690) -> (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0)
c  in CNF:
c     b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_2
c     b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_1
c     b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨  b^{30, 24}_0
c  in DIMACS:
 15083 -15084  15085  690 -15086 0
 15083 -15084  15085  690 -15087 0
 15083 -15084  15085  690  15088 0

c  1-1 --> 0
c    (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0 ∧ -p_690) -> (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧ -b^{30, 24}_0)
c  in CNF:
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_2
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_1
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_0
c  in DIMACS:
 15083  15084 -15085  690 -15086 0
 15083  15084 -15085  690 -15087 0
 15083  15084 -15085  690 -15088 0

c  0-1 --> -1
c    (-b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧ -p_690) -> ( b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0)
c  in CNF:
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨  b^{30, 24}_2
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_1
c     b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨  b^{30, 24}_0
c  in DIMACS:
 15083  15084  15085  690  15086 0
 15083  15084  15085  690 -15087 0
 15083  15084  15085  690  15088 0

c  -1-1 --> -2
c    ( b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧  b^{30, 23}_0 ∧ -p_690) -> ( b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0)
c  in CNF:
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨  b^{30, 24}_2
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨  b^{30, 24}_1
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨  p_690 ∨ -b^{30, 24}_0
c  in DIMACS:
-15083  15084 -15085  690  15086 0
-15083  15084 -15085  690  15087 0
-15083  15084 -15085  690 -15088 0

c  -2-1 --> break 
c    ( b^{30, 23}_2 ∧  b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨  b^{30, 23}_0 ∨  p_690 ∨ break
c  in DIMACS:
-15083 -15084  15085  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 23}_2 ∧ -b^{30, 23}_1 ∧ -b^{30, 23}_0 ∧ true) 
c  in CNF:
c    -b^{30, 23}_2 ∨  b^{30, 23}_1 ∨  b^{30, 23}_0 ∨ false 
c  in DIMACS:
-15083  15084  15085  0

c  3 does not represent an automaton state.
c    -(-b^{30, 23}_2 ∧  b^{30, 23}_1 ∧  b^{30, 23}_0 ∧ true) 
c  in CNF:
c     b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ false 
c  in DIMACS:
 15083 -15084 -15085  0
c  -3 does not represent an automaton state.
c    -( b^{30, 23}_2 ∧  b^{30, 23}_1 ∧  b^{30, 23}_0 ∧ true) 
c  in CNF:
c    -b^{30, 23}_2 ∨ -b^{30, 23}_1 ∨ -b^{30, 23}_0 ∨ false 
c  in DIMACS:
-15083 -15084 -15085  0

c i = 24
c  -2+1 --> -1
c    ( b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧  p_720) -> ( b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0)
c  in CNF:
c    -b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨  b^{30, 25}_2
c    -b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_1
c    -b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨  b^{30, 25}_0
c  in DIMACS:
-15086 -15087  15088 -720  15089 0
-15086 -15087  15088 -720 -15090 0
-15086 -15087  15088 -720  15091 0

c  -1+1 --> 0
c    ( b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0 ∧  p_720) -> (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧ -b^{30, 25}_0)
c  in CNF:
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_2
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_1
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_0
c  in DIMACS:
-15086  15087 -15088 -720 -15089 0
-15086  15087 -15088 -720 -15090 0
-15086  15087 -15088 -720 -15091 0

c  0+1 --> 1
c    (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧  p_720) -> (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0)
c  in CNF:
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_2
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_1
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨  b^{30, 25}_0
c  in DIMACS:
 15086  15087  15088 -720 -15089 0
 15086  15087  15088 -720 -15090 0
 15086  15087  15088 -720  15091 0

c  1+1 --> 2
c    (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0 ∧  p_720) -> (-b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0)
c  in CNF:
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_2
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨  b^{30, 25}_1
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ -p_720 ∨ -b^{30, 25}_0
c  in DIMACS:
 15086  15087 -15088 -720 -15089 0
 15086  15087 -15088 -720  15090 0
 15086  15087 -15088 -720 -15091 0

c  2+1 --> break 
c    (-b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧  p_720) -> break
c  in CNF:
c     b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 15086 -15087  15088 -720 1162 0


c  2-1 --> 1
c    (-b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧ -p_720) -> (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0)
c  in CNF:
c     b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_2
c     b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_1
c     b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨  b^{30, 25}_0
c  in DIMACS:
 15086 -15087  15088  720 -15089 0
 15086 -15087  15088  720 -15090 0
 15086 -15087  15088  720  15091 0

c  1-1 --> 0
c    (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0 ∧ -p_720) -> (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧ -b^{30, 25}_0)
c  in CNF:
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_2
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_1
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_0
c  in DIMACS:
 15086  15087 -15088  720 -15089 0
 15086  15087 -15088  720 -15090 0
 15086  15087 -15088  720 -15091 0

c  0-1 --> -1
c    (-b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧ -p_720) -> ( b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0)
c  in CNF:
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨  b^{30, 25}_2
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_1
c     b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨  b^{30, 25}_0
c  in DIMACS:
 15086  15087  15088  720  15089 0
 15086  15087  15088  720 -15090 0
 15086  15087  15088  720  15091 0

c  -1-1 --> -2
c    ( b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧  b^{30, 24}_0 ∧ -p_720) -> ( b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0)
c  in CNF:
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨  b^{30, 25}_2
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨  b^{30, 25}_1
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨  p_720 ∨ -b^{30, 25}_0
c  in DIMACS:
-15086  15087 -15088  720  15089 0
-15086  15087 -15088  720  15090 0
-15086  15087 -15088  720 -15091 0

c  -2-1 --> break 
c    ( b^{30, 24}_2 ∧  b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨  b^{30, 24}_0 ∨  p_720 ∨ break
c  in DIMACS:
-15086 -15087  15088  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 24}_2 ∧ -b^{30, 24}_1 ∧ -b^{30, 24}_0 ∧ true) 
c  in CNF:
c    -b^{30, 24}_2 ∨  b^{30, 24}_1 ∨  b^{30, 24}_0 ∨ false 
c  in DIMACS:
-15086  15087  15088  0

c  3 does not represent an automaton state.
c    -(-b^{30, 24}_2 ∧  b^{30, 24}_1 ∧  b^{30, 24}_0 ∧ true) 
c  in CNF:
c     b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ false 
c  in DIMACS:
 15086 -15087 -15088  0
c  -3 does not represent an automaton state.
c    -( b^{30, 24}_2 ∧  b^{30, 24}_1 ∧  b^{30, 24}_0 ∧ true) 
c  in CNF:
c    -b^{30, 24}_2 ∨ -b^{30, 24}_1 ∨ -b^{30, 24}_0 ∨ false 
c  in DIMACS:
-15086 -15087 -15088  0

c i = 25
c  -2+1 --> -1
c    ( b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧  p_750) -> ( b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0)
c  in CNF:
c    -b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨  b^{30, 26}_2
c    -b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_1
c    -b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨  b^{30, 26}_0
c  in DIMACS:
-15089 -15090  15091 -750  15092 0
-15089 -15090  15091 -750 -15093 0
-15089 -15090  15091 -750  15094 0

c  -1+1 --> 0
c    ( b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0 ∧  p_750) -> (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧ -b^{30, 26}_0)
c  in CNF:
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_2
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_1
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_0
c  in DIMACS:
-15089  15090 -15091 -750 -15092 0
-15089  15090 -15091 -750 -15093 0
-15089  15090 -15091 -750 -15094 0

c  0+1 --> 1
c    (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧  p_750) -> (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0)
c  in CNF:
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_2
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_1
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨  b^{30, 26}_0
c  in DIMACS:
 15089  15090  15091 -750 -15092 0
 15089  15090  15091 -750 -15093 0
 15089  15090  15091 -750  15094 0

c  1+1 --> 2
c    (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0 ∧  p_750) -> (-b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0)
c  in CNF:
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_2
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨  b^{30, 26}_1
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ -p_750 ∨ -b^{30, 26}_0
c  in DIMACS:
 15089  15090 -15091 -750 -15092 0
 15089  15090 -15091 -750  15093 0
 15089  15090 -15091 -750 -15094 0

c  2+1 --> break 
c    (-b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧  p_750) -> break
c  in CNF:
c     b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 15089 -15090  15091 -750 1162 0


c  2-1 --> 1
c    (-b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧ -p_750) -> (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0)
c  in CNF:
c     b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_2
c     b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_1
c     b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨  b^{30, 26}_0
c  in DIMACS:
 15089 -15090  15091  750 -15092 0
 15089 -15090  15091  750 -15093 0
 15089 -15090  15091  750  15094 0

c  1-1 --> 0
c    (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0 ∧ -p_750) -> (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧ -b^{30, 26}_0)
c  in CNF:
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_2
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_1
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_0
c  in DIMACS:
 15089  15090 -15091  750 -15092 0
 15089  15090 -15091  750 -15093 0
 15089  15090 -15091  750 -15094 0

c  0-1 --> -1
c    (-b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧ -p_750) -> ( b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0)
c  in CNF:
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨  b^{30, 26}_2
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_1
c     b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨  b^{30, 26}_0
c  in DIMACS:
 15089  15090  15091  750  15092 0
 15089  15090  15091  750 -15093 0
 15089  15090  15091  750  15094 0

c  -1-1 --> -2
c    ( b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧  b^{30, 25}_0 ∧ -p_750) -> ( b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0)
c  in CNF:
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨  b^{30, 26}_2
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨  b^{30, 26}_1
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨  p_750 ∨ -b^{30, 26}_0
c  in DIMACS:
-15089  15090 -15091  750  15092 0
-15089  15090 -15091  750  15093 0
-15089  15090 -15091  750 -15094 0

c  -2-1 --> break 
c    ( b^{30, 25}_2 ∧  b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨  b^{30, 25}_0 ∨  p_750 ∨ break
c  in DIMACS:
-15089 -15090  15091  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 25}_2 ∧ -b^{30, 25}_1 ∧ -b^{30, 25}_0 ∧ true) 
c  in CNF:
c    -b^{30, 25}_2 ∨  b^{30, 25}_1 ∨  b^{30, 25}_0 ∨ false 
c  in DIMACS:
-15089  15090  15091  0

c  3 does not represent an automaton state.
c    -(-b^{30, 25}_2 ∧  b^{30, 25}_1 ∧  b^{30, 25}_0 ∧ true) 
c  in CNF:
c     b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ false 
c  in DIMACS:
 15089 -15090 -15091  0
c  -3 does not represent an automaton state.
c    -( b^{30, 25}_2 ∧  b^{30, 25}_1 ∧  b^{30, 25}_0 ∧ true) 
c  in CNF:
c    -b^{30, 25}_2 ∨ -b^{30, 25}_1 ∨ -b^{30, 25}_0 ∨ false 
c  in DIMACS:
-15089 -15090 -15091  0

c i = 26
c  -2+1 --> -1
c    ( b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧  p_780) -> ( b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0)
c  in CNF:
c    -b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨  b^{30, 27}_2
c    -b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_1
c    -b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨  b^{30, 27}_0
c  in DIMACS:
-15092 -15093  15094 -780  15095 0
-15092 -15093  15094 -780 -15096 0
-15092 -15093  15094 -780  15097 0

c  -1+1 --> 0
c    ( b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0 ∧  p_780) -> (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧ -b^{30, 27}_0)
c  in CNF:
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_2
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_1
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_0
c  in DIMACS:
-15092  15093 -15094 -780 -15095 0
-15092  15093 -15094 -780 -15096 0
-15092  15093 -15094 -780 -15097 0

c  0+1 --> 1
c    (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧  p_780) -> (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0)
c  in CNF:
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_2
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_1
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨  b^{30, 27}_0
c  in DIMACS:
 15092  15093  15094 -780 -15095 0
 15092  15093  15094 -780 -15096 0
 15092  15093  15094 -780  15097 0

c  1+1 --> 2
c    (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0 ∧  p_780) -> (-b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0)
c  in CNF:
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_2
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨  b^{30, 27}_1
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ -p_780 ∨ -b^{30, 27}_0
c  in DIMACS:
 15092  15093 -15094 -780 -15095 0
 15092  15093 -15094 -780  15096 0
 15092  15093 -15094 -780 -15097 0

c  2+1 --> break 
c    (-b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧  p_780) -> break
c  in CNF:
c     b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 15092 -15093  15094 -780 1162 0


c  2-1 --> 1
c    (-b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧ -p_780) -> (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0)
c  in CNF:
c     b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_2
c     b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_1
c     b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨  b^{30, 27}_0
c  in DIMACS:
 15092 -15093  15094  780 -15095 0
 15092 -15093  15094  780 -15096 0
 15092 -15093  15094  780  15097 0

c  1-1 --> 0
c    (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0 ∧ -p_780) -> (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧ -b^{30, 27}_0)
c  in CNF:
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_2
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_1
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_0
c  in DIMACS:
 15092  15093 -15094  780 -15095 0
 15092  15093 -15094  780 -15096 0
 15092  15093 -15094  780 -15097 0

c  0-1 --> -1
c    (-b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧ -p_780) -> ( b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0)
c  in CNF:
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨  b^{30, 27}_2
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_1
c     b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨  b^{30, 27}_0
c  in DIMACS:
 15092  15093  15094  780  15095 0
 15092  15093  15094  780 -15096 0
 15092  15093  15094  780  15097 0

c  -1-1 --> -2
c    ( b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧  b^{30, 26}_0 ∧ -p_780) -> ( b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0)
c  in CNF:
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨  b^{30, 27}_2
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨  b^{30, 27}_1
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨  p_780 ∨ -b^{30, 27}_0
c  in DIMACS:
-15092  15093 -15094  780  15095 0
-15092  15093 -15094  780  15096 0
-15092  15093 -15094  780 -15097 0

c  -2-1 --> break 
c    ( b^{30, 26}_2 ∧  b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨  b^{30, 26}_0 ∨  p_780 ∨ break
c  in DIMACS:
-15092 -15093  15094  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 26}_2 ∧ -b^{30, 26}_1 ∧ -b^{30, 26}_0 ∧ true) 
c  in CNF:
c    -b^{30, 26}_2 ∨  b^{30, 26}_1 ∨  b^{30, 26}_0 ∨ false 
c  in DIMACS:
-15092  15093  15094  0

c  3 does not represent an automaton state.
c    -(-b^{30, 26}_2 ∧  b^{30, 26}_1 ∧  b^{30, 26}_0 ∧ true) 
c  in CNF:
c     b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ false 
c  in DIMACS:
 15092 -15093 -15094  0
c  -3 does not represent an automaton state.
c    -( b^{30, 26}_2 ∧  b^{30, 26}_1 ∧  b^{30, 26}_0 ∧ true) 
c  in CNF:
c    -b^{30, 26}_2 ∨ -b^{30, 26}_1 ∨ -b^{30, 26}_0 ∨ false 
c  in DIMACS:
-15092 -15093 -15094  0

c i = 27
c  -2+1 --> -1
c    ( b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧  p_810) -> ( b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0)
c  in CNF:
c    -b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨  b^{30, 28}_2
c    -b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_1
c    -b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨  b^{30, 28}_0
c  in DIMACS:
-15095 -15096  15097 -810  15098 0
-15095 -15096  15097 -810 -15099 0
-15095 -15096  15097 -810  15100 0

c  -1+1 --> 0
c    ( b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0 ∧  p_810) -> (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧ -b^{30, 28}_0)
c  in CNF:
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_2
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_1
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_0
c  in DIMACS:
-15095  15096 -15097 -810 -15098 0
-15095  15096 -15097 -810 -15099 0
-15095  15096 -15097 -810 -15100 0

c  0+1 --> 1
c    (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧  p_810) -> (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0)
c  in CNF:
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_2
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_1
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨  b^{30, 28}_0
c  in DIMACS:
 15095  15096  15097 -810 -15098 0
 15095  15096  15097 -810 -15099 0
 15095  15096  15097 -810  15100 0

c  1+1 --> 2
c    (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0 ∧  p_810) -> (-b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0)
c  in CNF:
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_2
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨  b^{30, 28}_1
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ -p_810 ∨ -b^{30, 28}_0
c  in DIMACS:
 15095  15096 -15097 -810 -15098 0
 15095  15096 -15097 -810  15099 0
 15095  15096 -15097 -810 -15100 0

c  2+1 --> break 
c    (-b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧  p_810) -> break
c  in CNF:
c     b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 15095 -15096  15097 -810 1162 0


c  2-1 --> 1
c    (-b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧ -p_810) -> (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0)
c  in CNF:
c     b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_2
c     b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_1
c     b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨  b^{30, 28}_0
c  in DIMACS:
 15095 -15096  15097  810 -15098 0
 15095 -15096  15097  810 -15099 0
 15095 -15096  15097  810  15100 0

c  1-1 --> 0
c    (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0 ∧ -p_810) -> (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧ -b^{30, 28}_0)
c  in CNF:
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_2
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_1
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_0
c  in DIMACS:
 15095  15096 -15097  810 -15098 0
 15095  15096 -15097  810 -15099 0
 15095  15096 -15097  810 -15100 0

c  0-1 --> -1
c    (-b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧ -p_810) -> ( b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0)
c  in CNF:
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨  b^{30, 28}_2
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_1
c     b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨  b^{30, 28}_0
c  in DIMACS:
 15095  15096  15097  810  15098 0
 15095  15096  15097  810 -15099 0
 15095  15096  15097  810  15100 0

c  -1-1 --> -2
c    ( b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧  b^{30, 27}_0 ∧ -p_810) -> ( b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0)
c  in CNF:
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨  b^{30, 28}_2
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨  b^{30, 28}_1
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨  p_810 ∨ -b^{30, 28}_0
c  in DIMACS:
-15095  15096 -15097  810  15098 0
-15095  15096 -15097  810  15099 0
-15095  15096 -15097  810 -15100 0

c  -2-1 --> break 
c    ( b^{30, 27}_2 ∧  b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨  b^{30, 27}_0 ∨  p_810 ∨ break
c  in DIMACS:
-15095 -15096  15097  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 27}_2 ∧ -b^{30, 27}_1 ∧ -b^{30, 27}_0 ∧ true) 
c  in CNF:
c    -b^{30, 27}_2 ∨  b^{30, 27}_1 ∨  b^{30, 27}_0 ∨ false 
c  in DIMACS:
-15095  15096  15097  0

c  3 does not represent an automaton state.
c    -(-b^{30, 27}_2 ∧  b^{30, 27}_1 ∧  b^{30, 27}_0 ∧ true) 
c  in CNF:
c     b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ false 
c  in DIMACS:
 15095 -15096 -15097  0
c  -3 does not represent an automaton state.
c    -( b^{30, 27}_2 ∧  b^{30, 27}_1 ∧  b^{30, 27}_0 ∧ true) 
c  in CNF:
c    -b^{30, 27}_2 ∨ -b^{30, 27}_1 ∨ -b^{30, 27}_0 ∨ false 
c  in DIMACS:
-15095 -15096 -15097  0

c i = 28
c  -2+1 --> -1
c    ( b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧  p_840) -> ( b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0)
c  in CNF:
c    -b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨  b^{30, 29}_2
c    -b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_1
c    -b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨  b^{30, 29}_0
c  in DIMACS:
-15098 -15099  15100 -840  15101 0
-15098 -15099  15100 -840 -15102 0
-15098 -15099  15100 -840  15103 0

c  -1+1 --> 0
c    ( b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0 ∧  p_840) -> (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧ -b^{30, 29}_0)
c  in CNF:
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_2
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_1
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_0
c  in DIMACS:
-15098  15099 -15100 -840 -15101 0
-15098  15099 -15100 -840 -15102 0
-15098  15099 -15100 -840 -15103 0

c  0+1 --> 1
c    (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧  p_840) -> (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0)
c  in CNF:
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_2
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_1
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨  b^{30, 29}_0
c  in DIMACS:
 15098  15099  15100 -840 -15101 0
 15098  15099  15100 -840 -15102 0
 15098  15099  15100 -840  15103 0

c  1+1 --> 2
c    (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0 ∧  p_840) -> (-b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0)
c  in CNF:
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_2
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨  b^{30, 29}_1
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ -p_840 ∨ -b^{30, 29}_0
c  in DIMACS:
 15098  15099 -15100 -840 -15101 0
 15098  15099 -15100 -840  15102 0
 15098  15099 -15100 -840 -15103 0

c  2+1 --> break 
c    (-b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧  p_840) -> break
c  in CNF:
c     b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 15098 -15099  15100 -840 1162 0


c  2-1 --> 1
c    (-b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧ -p_840) -> (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0)
c  in CNF:
c     b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_2
c     b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_1
c     b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨  b^{30, 29}_0
c  in DIMACS:
 15098 -15099  15100  840 -15101 0
 15098 -15099  15100  840 -15102 0
 15098 -15099  15100  840  15103 0

c  1-1 --> 0
c    (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0 ∧ -p_840) -> (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧ -b^{30, 29}_0)
c  in CNF:
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_2
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_1
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_0
c  in DIMACS:
 15098  15099 -15100  840 -15101 0
 15098  15099 -15100  840 -15102 0
 15098  15099 -15100  840 -15103 0

c  0-1 --> -1
c    (-b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧ -p_840) -> ( b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0)
c  in CNF:
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨  b^{30, 29}_2
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_1
c     b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨  b^{30, 29}_0
c  in DIMACS:
 15098  15099  15100  840  15101 0
 15098  15099  15100  840 -15102 0
 15098  15099  15100  840  15103 0

c  -1-1 --> -2
c    ( b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧  b^{30, 28}_0 ∧ -p_840) -> ( b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0)
c  in CNF:
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨  b^{30, 29}_2
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨  b^{30, 29}_1
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨  p_840 ∨ -b^{30, 29}_0
c  in DIMACS:
-15098  15099 -15100  840  15101 0
-15098  15099 -15100  840  15102 0
-15098  15099 -15100  840 -15103 0

c  -2-1 --> break 
c    ( b^{30, 28}_2 ∧  b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨  b^{30, 28}_0 ∨  p_840 ∨ break
c  in DIMACS:
-15098 -15099  15100  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 28}_2 ∧ -b^{30, 28}_1 ∧ -b^{30, 28}_0 ∧ true) 
c  in CNF:
c    -b^{30, 28}_2 ∨  b^{30, 28}_1 ∨  b^{30, 28}_0 ∨ false 
c  in DIMACS:
-15098  15099  15100  0

c  3 does not represent an automaton state.
c    -(-b^{30, 28}_2 ∧  b^{30, 28}_1 ∧  b^{30, 28}_0 ∧ true) 
c  in CNF:
c     b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ false 
c  in DIMACS:
 15098 -15099 -15100  0
c  -3 does not represent an automaton state.
c    -( b^{30, 28}_2 ∧  b^{30, 28}_1 ∧  b^{30, 28}_0 ∧ true) 
c  in CNF:
c    -b^{30, 28}_2 ∨ -b^{30, 28}_1 ∨ -b^{30, 28}_0 ∨ false 
c  in DIMACS:
-15098 -15099 -15100  0

c i = 29
c  -2+1 --> -1
c    ( b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧  p_870) -> ( b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0)
c  in CNF:
c    -b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨  b^{30, 30}_2
c    -b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_1
c    -b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨  b^{30, 30}_0
c  in DIMACS:
-15101 -15102  15103 -870  15104 0
-15101 -15102  15103 -870 -15105 0
-15101 -15102  15103 -870  15106 0

c  -1+1 --> 0
c    ( b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0 ∧  p_870) -> (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧ -b^{30, 30}_0)
c  in CNF:
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_2
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_1
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_0
c  in DIMACS:
-15101  15102 -15103 -870 -15104 0
-15101  15102 -15103 -870 -15105 0
-15101  15102 -15103 -870 -15106 0

c  0+1 --> 1
c    (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧  p_870) -> (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0)
c  in CNF:
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_2
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_1
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨  b^{30, 30}_0
c  in DIMACS:
 15101  15102  15103 -870 -15104 0
 15101  15102  15103 -870 -15105 0
 15101  15102  15103 -870  15106 0

c  1+1 --> 2
c    (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0 ∧  p_870) -> (-b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0)
c  in CNF:
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_2
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨  b^{30, 30}_1
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ -p_870 ∨ -b^{30, 30}_0
c  in DIMACS:
 15101  15102 -15103 -870 -15104 0
 15101  15102 -15103 -870  15105 0
 15101  15102 -15103 -870 -15106 0

c  2+1 --> break 
c    (-b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧  p_870) -> break
c  in CNF:
c     b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 15101 -15102  15103 -870 1162 0


c  2-1 --> 1
c    (-b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧ -p_870) -> (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0)
c  in CNF:
c     b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_2
c     b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_1
c     b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨  b^{30, 30}_0
c  in DIMACS:
 15101 -15102  15103  870 -15104 0
 15101 -15102  15103  870 -15105 0
 15101 -15102  15103  870  15106 0

c  1-1 --> 0
c    (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0 ∧ -p_870) -> (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧ -b^{30, 30}_0)
c  in CNF:
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_2
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_1
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_0
c  in DIMACS:
 15101  15102 -15103  870 -15104 0
 15101  15102 -15103  870 -15105 0
 15101  15102 -15103  870 -15106 0

c  0-1 --> -1
c    (-b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧ -p_870) -> ( b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0)
c  in CNF:
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨  b^{30, 30}_2
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_1
c     b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨  b^{30, 30}_0
c  in DIMACS:
 15101  15102  15103  870  15104 0
 15101  15102  15103  870 -15105 0
 15101  15102  15103  870  15106 0

c  -1-1 --> -2
c    ( b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧  b^{30, 29}_0 ∧ -p_870) -> ( b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0)
c  in CNF:
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨  b^{30, 30}_2
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨  b^{30, 30}_1
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨  p_870 ∨ -b^{30, 30}_0
c  in DIMACS:
-15101  15102 -15103  870  15104 0
-15101  15102 -15103  870  15105 0
-15101  15102 -15103  870 -15106 0

c  -2-1 --> break 
c    ( b^{30, 29}_2 ∧  b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨  b^{30, 29}_0 ∨  p_870 ∨ break
c  in DIMACS:
-15101 -15102  15103  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 29}_2 ∧ -b^{30, 29}_1 ∧ -b^{30, 29}_0 ∧ true) 
c  in CNF:
c    -b^{30, 29}_2 ∨  b^{30, 29}_1 ∨  b^{30, 29}_0 ∨ false 
c  in DIMACS:
-15101  15102  15103  0

c  3 does not represent an automaton state.
c    -(-b^{30, 29}_2 ∧  b^{30, 29}_1 ∧  b^{30, 29}_0 ∧ true) 
c  in CNF:
c     b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ false 
c  in DIMACS:
 15101 -15102 -15103  0
c  -3 does not represent an automaton state.
c    -( b^{30, 29}_2 ∧  b^{30, 29}_1 ∧  b^{30, 29}_0 ∧ true) 
c  in CNF:
c    -b^{30, 29}_2 ∨ -b^{30, 29}_1 ∨ -b^{30, 29}_0 ∨ false 
c  in DIMACS:
-15101 -15102 -15103  0

c i = 30
c  -2+1 --> -1
c    ( b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧  p_900) -> ( b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0)
c  in CNF:
c    -b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨  b^{30, 31}_2
c    -b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_1
c    -b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨  b^{30, 31}_0
c  in DIMACS:
-15104 -15105  15106 -900  15107 0
-15104 -15105  15106 -900 -15108 0
-15104 -15105  15106 -900  15109 0

c  -1+1 --> 0
c    ( b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0 ∧  p_900) -> (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧ -b^{30, 31}_0)
c  in CNF:
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_2
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_1
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_0
c  in DIMACS:
-15104  15105 -15106 -900 -15107 0
-15104  15105 -15106 -900 -15108 0
-15104  15105 -15106 -900 -15109 0

c  0+1 --> 1
c    (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧  p_900) -> (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0)
c  in CNF:
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_2
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_1
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨  b^{30, 31}_0
c  in DIMACS:
 15104  15105  15106 -900 -15107 0
 15104  15105  15106 -900 -15108 0
 15104  15105  15106 -900  15109 0

c  1+1 --> 2
c    (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0 ∧  p_900) -> (-b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0)
c  in CNF:
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_2
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨  b^{30, 31}_1
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ -p_900 ∨ -b^{30, 31}_0
c  in DIMACS:
 15104  15105 -15106 -900 -15107 0
 15104  15105 -15106 -900  15108 0
 15104  15105 -15106 -900 -15109 0

c  2+1 --> break 
c    (-b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧  p_900) -> break
c  in CNF:
c     b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 15104 -15105  15106 -900 1162 0


c  2-1 --> 1
c    (-b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧ -p_900) -> (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0)
c  in CNF:
c     b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_2
c     b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_1
c     b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨  b^{30, 31}_0
c  in DIMACS:
 15104 -15105  15106  900 -15107 0
 15104 -15105  15106  900 -15108 0
 15104 -15105  15106  900  15109 0

c  1-1 --> 0
c    (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0 ∧ -p_900) -> (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧ -b^{30, 31}_0)
c  in CNF:
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_2
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_1
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_0
c  in DIMACS:
 15104  15105 -15106  900 -15107 0
 15104  15105 -15106  900 -15108 0
 15104  15105 -15106  900 -15109 0

c  0-1 --> -1
c    (-b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧ -p_900) -> ( b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0)
c  in CNF:
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨  b^{30, 31}_2
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_1
c     b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨  b^{30, 31}_0
c  in DIMACS:
 15104  15105  15106  900  15107 0
 15104  15105  15106  900 -15108 0
 15104  15105  15106  900  15109 0

c  -1-1 --> -2
c    ( b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧  b^{30, 30}_0 ∧ -p_900) -> ( b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0)
c  in CNF:
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨  b^{30, 31}_2
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨  b^{30, 31}_1
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨  p_900 ∨ -b^{30, 31}_0
c  in DIMACS:
-15104  15105 -15106  900  15107 0
-15104  15105 -15106  900  15108 0
-15104  15105 -15106  900 -15109 0

c  -2-1 --> break 
c    ( b^{30, 30}_2 ∧  b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨  b^{30, 30}_0 ∨  p_900 ∨ break
c  in DIMACS:
-15104 -15105  15106  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 30}_2 ∧ -b^{30, 30}_1 ∧ -b^{30, 30}_0 ∧ true) 
c  in CNF:
c    -b^{30, 30}_2 ∨  b^{30, 30}_1 ∨  b^{30, 30}_0 ∨ false 
c  in DIMACS:
-15104  15105  15106  0

c  3 does not represent an automaton state.
c    -(-b^{30, 30}_2 ∧  b^{30, 30}_1 ∧  b^{30, 30}_0 ∧ true) 
c  in CNF:
c     b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ false 
c  in DIMACS:
 15104 -15105 -15106  0
c  -3 does not represent an automaton state.
c    -( b^{30, 30}_2 ∧  b^{30, 30}_1 ∧  b^{30, 30}_0 ∧ true) 
c  in CNF:
c    -b^{30, 30}_2 ∨ -b^{30, 30}_1 ∨ -b^{30, 30}_0 ∨ false 
c  in DIMACS:
-15104 -15105 -15106  0

c i = 31
c  -2+1 --> -1
c    ( b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧  p_930) -> ( b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0)
c  in CNF:
c    -b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨  b^{30, 32}_2
c    -b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_1
c    -b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨  b^{30, 32}_0
c  in DIMACS:
-15107 -15108  15109 -930  15110 0
-15107 -15108  15109 -930 -15111 0
-15107 -15108  15109 -930  15112 0

c  -1+1 --> 0
c    ( b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0 ∧  p_930) -> (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧ -b^{30, 32}_0)
c  in CNF:
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_2
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_1
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_0
c  in DIMACS:
-15107  15108 -15109 -930 -15110 0
-15107  15108 -15109 -930 -15111 0
-15107  15108 -15109 -930 -15112 0

c  0+1 --> 1
c    (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧  p_930) -> (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0)
c  in CNF:
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_2
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_1
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨  b^{30, 32}_0
c  in DIMACS:
 15107  15108  15109 -930 -15110 0
 15107  15108  15109 -930 -15111 0
 15107  15108  15109 -930  15112 0

c  1+1 --> 2
c    (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0 ∧  p_930) -> (-b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0)
c  in CNF:
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_2
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨  b^{30, 32}_1
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ -p_930 ∨ -b^{30, 32}_0
c  in DIMACS:
 15107  15108 -15109 -930 -15110 0
 15107  15108 -15109 -930  15111 0
 15107  15108 -15109 -930 -15112 0

c  2+1 --> break 
c    (-b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧  p_930) -> break
c  in CNF:
c     b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 15107 -15108  15109 -930 1162 0


c  2-1 --> 1
c    (-b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧ -p_930) -> (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0)
c  in CNF:
c     b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_2
c     b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_1
c     b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨  b^{30, 32}_0
c  in DIMACS:
 15107 -15108  15109  930 -15110 0
 15107 -15108  15109  930 -15111 0
 15107 -15108  15109  930  15112 0

c  1-1 --> 0
c    (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0 ∧ -p_930) -> (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧ -b^{30, 32}_0)
c  in CNF:
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_2
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_1
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_0
c  in DIMACS:
 15107  15108 -15109  930 -15110 0
 15107  15108 -15109  930 -15111 0
 15107  15108 -15109  930 -15112 0

c  0-1 --> -1
c    (-b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧ -p_930) -> ( b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0)
c  in CNF:
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨  b^{30, 32}_2
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_1
c     b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨  b^{30, 32}_0
c  in DIMACS:
 15107  15108  15109  930  15110 0
 15107  15108  15109  930 -15111 0
 15107  15108  15109  930  15112 0

c  -1-1 --> -2
c    ( b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧  b^{30, 31}_0 ∧ -p_930) -> ( b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0)
c  in CNF:
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨  b^{30, 32}_2
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨  b^{30, 32}_1
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨  p_930 ∨ -b^{30, 32}_0
c  in DIMACS:
-15107  15108 -15109  930  15110 0
-15107  15108 -15109  930  15111 0
-15107  15108 -15109  930 -15112 0

c  -2-1 --> break 
c    ( b^{30, 31}_2 ∧  b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨  b^{30, 31}_0 ∨  p_930 ∨ break
c  in DIMACS:
-15107 -15108  15109  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 31}_2 ∧ -b^{30, 31}_1 ∧ -b^{30, 31}_0 ∧ true) 
c  in CNF:
c    -b^{30, 31}_2 ∨  b^{30, 31}_1 ∨  b^{30, 31}_0 ∨ false 
c  in DIMACS:
-15107  15108  15109  0

c  3 does not represent an automaton state.
c    -(-b^{30, 31}_2 ∧  b^{30, 31}_1 ∧  b^{30, 31}_0 ∧ true) 
c  in CNF:
c     b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ false 
c  in DIMACS:
 15107 -15108 -15109  0
c  -3 does not represent an automaton state.
c    -( b^{30, 31}_2 ∧  b^{30, 31}_1 ∧  b^{30, 31}_0 ∧ true) 
c  in CNF:
c    -b^{30, 31}_2 ∨ -b^{30, 31}_1 ∨ -b^{30, 31}_0 ∨ false 
c  in DIMACS:
-15107 -15108 -15109  0

c i = 32
c  -2+1 --> -1
c    ( b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧  p_960) -> ( b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0)
c  in CNF:
c    -b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨  b^{30, 33}_2
c    -b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_1
c    -b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨  b^{30, 33}_0
c  in DIMACS:
-15110 -15111  15112 -960  15113 0
-15110 -15111  15112 -960 -15114 0
-15110 -15111  15112 -960  15115 0

c  -1+1 --> 0
c    ( b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0 ∧  p_960) -> (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧ -b^{30, 33}_0)
c  in CNF:
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_2
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_1
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_0
c  in DIMACS:
-15110  15111 -15112 -960 -15113 0
-15110  15111 -15112 -960 -15114 0
-15110  15111 -15112 -960 -15115 0

c  0+1 --> 1
c    (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧  p_960) -> (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0)
c  in CNF:
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_2
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_1
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨  b^{30, 33}_0
c  in DIMACS:
 15110  15111  15112 -960 -15113 0
 15110  15111  15112 -960 -15114 0
 15110  15111  15112 -960  15115 0

c  1+1 --> 2
c    (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0 ∧  p_960) -> (-b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0)
c  in CNF:
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_2
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨  b^{30, 33}_1
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ -p_960 ∨ -b^{30, 33}_0
c  in DIMACS:
 15110  15111 -15112 -960 -15113 0
 15110  15111 -15112 -960  15114 0
 15110  15111 -15112 -960 -15115 0

c  2+1 --> break 
c    (-b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧  p_960) -> break
c  in CNF:
c     b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 15110 -15111  15112 -960 1162 0


c  2-1 --> 1
c    (-b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧ -p_960) -> (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0)
c  in CNF:
c     b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_2
c     b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_1
c     b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨  b^{30, 33}_0
c  in DIMACS:
 15110 -15111  15112  960 -15113 0
 15110 -15111  15112  960 -15114 0
 15110 -15111  15112  960  15115 0

c  1-1 --> 0
c    (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0 ∧ -p_960) -> (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧ -b^{30, 33}_0)
c  in CNF:
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_2
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_1
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_0
c  in DIMACS:
 15110  15111 -15112  960 -15113 0
 15110  15111 -15112  960 -15114 0
 15110  15111 -15112  960 -15115 0

c  0-1 --> -1
c    (-b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧ -p_960) -> ( b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0)
c  in CNF:
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨  b^{30, 33}_2
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_1
c     b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨  b^{30, 33}_0
c  in DIMACS:
 15110  15111  15112  960  15113 0
 15110  15111  15112  960 -15114 0
 15110  15111  15112  960  15115 0

c  -1-1 --> -2
c    ( b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧  b^{30, 32}_0 ∧ -p_960) -> ( b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0)
c  in CNF:
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨  b^{30, 33}_2
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨  b^{30, 33}_1
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨  p_960 ∨ -b^{30, 33}_0
c  in DIMACS:
-15110  15111 -15112  960  15113 0
-15110  15111 -15112  960  15114 0
-15110  15111 -15112  960 -15115 0

c  -2-1 --> break 
c    ( b^{30, 32}_2 ∧  b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨  b^{30, 32}_0 ∨  p_960 ∨ break
c  in DIMACS:
-15110 -15111  15112  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 32}_2 ∧ -b^{30, 32}_1 ∧ -b^{30, 32}_0 ∧ true) 
c  in CNF:
c    -b^{30, 32}_2 ∨  b^{30, 32}_1 ∨  b^{30, 32}_0 ∨ false 
c  in DIMACS:
-15110  15111  15112  0

c  3 does not represent an automaton state.
c    -(-b^{30, 32}_2 ∧  b^{30, 32}_1 ∧  b^{30, 32}_0 ∧ true) 
c  in CNF:
c     b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ false 
c  in DIMACS:
 15110 -15111 -15112  0
c  -3 does not represent an automaton state.
c    -( b^{30, 32}_2 ∧  b^{30, 32}_1 ∧  b^{30, 32}_0 ∧ true) 
c  in CNF:
c    -b^{30, 32}_2 ∨ -b^{30, 32}_1 ∨ -b^{30, 32}_0 ∨ false 
c  in DIMACS:
-15110 -15111 -15112  0

c i = 33
c  -2+1 --> -1
c    ( b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧  p_990) -> ( b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0)
c  in CNF:
c    -b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨  b^{30, 34}_2
c    -b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_1
c    -b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨  b^{30, 34}_0
c  in DIMACS:
-15113 -15114  15115 -990  15116 0
-15113 -15114  15115 -990 -15117 0
-15113 -15114  15115 -990  15118 0

c  -1+1 --> 0
c    ( b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0 ∧  p_990) -> (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧ -b^{30, 34}_0)
c  in CNF:
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_2
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_1
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_0
c  in DIMACS:
-15113  15114 -15115 -990 -15116 0
-15113  15114 -15115 -990 -15117 0
-15113  15114 -15115 -990 -15118 0

c  0+1 --> 1
c    (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧  p_990) -> (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0)
c  in CNF:
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_2
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_1
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨  b^{30, 34}_0
c  in DIMACS:
 15113  15114  15115 -990 -15116 0
 15113  15114  15115 -990 -15117 0
 15113  15114  15115 -990  15118 0

c  1+1 --> 2
c    (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0 ∧  p_990) -> (-b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0)
c  in CNF:
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_2
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨  b^{30, 34}_1
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ -p_990 ∨ -b^{30, 34}_0
c  in DIMACS:
 15113  15114 -15115 -990 -15116 0
 15113  15114 -15115 -990  15117 0
 15113  15114 -15115 -990 -15118 0

c  2+1 --> break 
c    (-b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧  p_990) -> break
c  in CNF:
c     b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 15113 -15114  15115 -990 1162 0


c  2-1 --> 1
c    (-b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧ -p_990) -> (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0)
c  in CNF:
c     b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_2
c     b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_1
c     b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨  b^{30, 34}_0
c  in DIMACS:
 15113 -15114  15115  990 -15116 0
 15113 -15114  15115  990 -15117 0
 15113 -15114  15115  990  15118 0

c  1-1 --> 0
c    (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0 ∧ -p_990) -> (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧ -b^{30, 34}_0)
c  in CNF:
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_2
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_1
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_0
c  in DIMACS:
 15113  15114 -15115  990 -15116 0
 15113  15114 -15115  990 -15117 0
 15113  15114 -15115  990 -15118 0

c  0-1 --> -1
c    (-b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧ -p_990) -> ( b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0)
c  in CNF:
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨  b^{30, 34}_2
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_1
c     b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨  b^{30, 34}_0
c  in DIMACS:
 15113  15114  15115  990  15116 0
 15113  15114  15115  990 -15117 0
 15113  15114  15115  990  15118 0

c  -1-1 --> -2
c    ( b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧  b^{30, 33}_0 ∧ -p_990) -> ( b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0)
c  in CNF:
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨  b^{30, 34}_2
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨  b^{30, 34}_1
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨  p_990 ∨ -b^{30, 34}_0
c  in DIMACS:
-15113  15114 -15115  990  15116 0
-15113  15114 -15115  990  15117 0
-15113  15114 -15115  990 -15118 0

c  -2-1 --> break 
c    ( b^{30, 33}_2 ∧  b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨  b^{30, 33}_0 ∨  p_990 ∨ break
c  in DIMACS:
-15113 -15114  15115  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 33}_2 ∧ -b^{30, 33}_1 ∧ -b^{30, 33}_0 ∧ true) 
c  in CNF:
c    -b^{30, 33}_2 ∨  b^{30, 33}_1 ∨  b^{30, 33}_0 ∨ false 
c  in DIMACS:
-15113  15114  15115  0

c  3 does not represent an automaton state.
c    -(-b^{30, 33}_2 ∧  b^{30, 33}_1 ∧  b^{30, 33}_0 ∧ true) 
c  in CNF:
c     b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ false 
c  in DIMACS:
 15113 -15114 -15115  0
c  -3 does not represent an automaton state.
c    -( b^{30, 33}_2 ∧  b^{30, 33}_1 ∧  b^{30, 33}_0 ∧ true) 
c  in CNF:
c    -b^{30, 33}_2 ∨ -b^{30, 33}_1 ∨ -b^{30, 33}_0 ∨ false 
c  in DIMACS:
-15113 -15114 -15115  0

c i = 34
c  -2+1 --> -1
c    ( b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧  p_1020) -> ( b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0)
c  in CNF:
c    -b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨  b^{30, 35}_2
c    -b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_1
c    -b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨  b^{30, 35}_0
c  in DIMACS:
-15116 -15117  15118 -1020  15119 0
-15116 -15117  15118 -1020 -15120 0
-15116 -15117  15118 -1020  15121 0

c  -1+1 --> 0
c    ( b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0 ∧  p_1020) -> (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧ -b^{30, 35}_0)
c  in CNF:
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_2
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_1
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_0
c  in DIMACS:
-15116  15117 -15118 -1020 -15119 0
-15116  15117 -15118 -1020 -15120 0
-15116  15117 -15118 -1020 -15121 0

c  0+1 --> 1
c    (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧  p_1020) -> (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0)
c  in CNF:
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_2
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_1
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨  b^{30, 35}_0
c  in DIMACS:
 15116  15117  15118 -1020 -15119 0
 15116  15117  15118 -1020 -15120 0
 15116  15117  15118 -1020  15121 0

c  1+1 --> 2
c    (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0 ∧  p_1020) -> (-b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0)
c  in CNF:
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_2
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨  b^{30, 35}_1
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ -p_1020 ∨ -b^{30, 35}_0
c  in DIMACS:
 15116  15117 -15118 -1020 -15119 0
 15116  15117 -15118 -1020  15120 0
 15116  15117 -15118 -1020 -15121 0

c  2+1 --> break 
c    (-b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 15116 -15117  15118 -1020 1162 0


c  2-1 --> 1
c    (-b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧ -p_1020) -> (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0)
c  in CNF:
c     b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_2
c     b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_1
c     b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨  b^{30, 35}_0
c  in DIMACS:
 15116 -15117  15118  1020 -15119 0
 15116 -15117  15118  1020 -15120 0
 15116 -15117  15118  1020  15121 0

c  1-1 --> 0
c    (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0 ∧ -p_1020) -> (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧ -b^{30, 35}_0)
c  in CNF:
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_2
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_1
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_0
c  in DIMACS:
 15116  15117 -15118  1020 -15119 0
 15116  15117 -15118  1020 -15120 0
 15116  15117 -15118  1020 -15121 0

c  0-1 --> -1
c    (-b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧ -p_1020) -> ( b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0)
c  in CNF:
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨  b^{30, 35}_2
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_1
c     b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨  b^{30, 35}_0
c  in DIMACS:
 15116  15117  15118  1020  15119 0
 15116  15117  15118  1020 -15120 0
 15116  15117  15118  1020  15121 0

c  -1-1 --> -2
c    ( b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧  b^{30, 34}_0 ∧ -p_1020) -> ( b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0)
c  in CNF:
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨  b^{30, 35}_2
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨  b^{30, 35}_1
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨  p_1020 ∨ -b^{30, 35}_0
c  in DIMACS:
-15116  15117 -15118  1020  15119 0
-15116  15117 -15118  1020  15120 0
-15116  15117 -15118  1020 -15121 0

c  -2-1 --> break 
c    ( b^{30, 34}_2 ∧  b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨  b^{30, 34}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-15116 -15117  15118  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 34}_2 ∧ -b^{30, 34}_1 ∧ -b^{30, 34}_0 ∧ true) 
c  in CNF:
c    -b^{30, 34}_2 ∨  b^{30, 34}_1 ∨  b^{30, 34}_0 ∨ false 
c  in DIMACS:
-15116  15117  15118  0

c  3 does not represent an automaton state.
c    -(-b^{30, 34}_2 ∧  b^{30, 34}_1 ∧  b^{30, 34}_0 ∧ true) 
c  in CNF:
c     b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ false 
c  in DIMACS:
 15116 -15117 -15118  0
c  -3 does not represent an automaton state.
c    -( b^{30, 34}_2 ∧  b^{30, 34}_1 ∧  b^{30, 34}_0 ∧ true) 
c  in CNF:
c    -b^{30, 34}_2 ∨ -b^{30, 34}_1 ∨ -b^{30, 34}_0 ∨ false 
c  in DIMACS:
-15116 -15117 -15118  0

c i = 35
c  -2+1 --> -1
c    ( b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧  p_1050) -> ( b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0)
c  in CNF:
c    -b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨  b^{30, 36}_2
c    -b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_1
c    -b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨  b^{30, 36}_0
c  in DIMACS:
-15119 -15120  15121 -1050  15122 0
-15119 -15120  15121 -1050 -15123 0
-15119 -15120  15121 -1050  15124 0

c  -1+1 --> 0
c    ( b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0 ∧  p_1050) -> (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧ -b^{30, 36}_0)
c  in CNF:
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_2
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_1
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_0
c  in DIMACS:
-15119  15120 -15121 -1050 -15122 0
-15119  15120 -15121 -1050 -15123 0
-15119  15120 -15121 -1050 -15124 0

c  0+1 --> 1
c    (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧  p_1050) -> (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0)
c  in CNF:
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_2
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_1
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨  b^{30, 36}_0
c  in DIMACS:
 15119  15120  15121 -1050 -15122 0
 15119  15120  15121 -1050 -15123 0
 15119  15120  15121 -1050  15124 0

c  1+1 --> 2
c    (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0 ∧  p_1050) -> (-b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0)
c  in CNF:
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_2
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨  b^{30, 36}_1
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ -p_1050 ∨ -b^{30, 36}_0
c  in DIMACS:
 15119  15120 -15121 -1050 -15122 0
 15119  15120 -15121 -1050  15123 0
 15119  15120 -15121 -1050 -15124 0

c  2+1 --> break 
c    (-b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 15119 -15120  15121 -1050 1162 0


c  2-1 --> 1
c    (-b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧ -p_1050) -> (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0)
c  in CNF:
c     b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_2
c     b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_1
c     b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨  b^{30, 36}_0
c  in DIMACS:
 15119 -15120  15121  1050 -15122 0
 15119 -15120  15121  1050 -15123 0
 15119 -15120  15121  1050  15124 0

c  1-1 --> 0
c    (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0 ∧ -p_1050) -> (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧ -b^{30, 36}_0)
c  in CNF:
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_2
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_1
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_0
c  in DIMACS:
 15119  15120 -15121  1050 -15122 0
 15119  15120 -15121  1050 -15123 0
 15119  15120 -15121  1050 -15124 0

c  0-1 --> -1
c    (-b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧ -p_1050) -> ( b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0)
c  in CNF:
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨  b^{30, 36}_2
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_1
c     b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨  b^{30, 36}_0
c  in DIMACS:
 15119  15120  15121  1050  15122 0
 15119  15120  15121  1050 -15123 0
 15119  15120  15121  1050  15124 0

c  -1-1 --> -2
c    ( b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧  b^{30, 35}_0 ∧ -p_1050) -> ( b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0)
c  in CNF:
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨  b^{30, 36}_2
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨  b^{30, 36}_1
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨  p_1050 ∨ -b^{30, 36}_0
c  in DIMACS:
-15119  15120 -15121  1050  15122 0
-15119  15120 -15121  1050  15123 0
-15119  15120 -15121  1050 -15124 0

c  -2-1 --> break 
c    ( b^{30, 35}_2 ∧  b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨  b^{30, 35}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-15119 -15120  15121  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 35}_2 ∧ -b^{30, 35}_1 ∧ -b^{30, 35}_0 ∧ true) 
c  in CNF:
c    -b^{30, 35}_2 ∨  b^{30, 35}_1 ∨  b^{30, 35}_0 ∨ false 
c  in DIMACS:
-15119  15120  15121  0

c  3 does not represent an automaton state.
c    -(-b^{30, 35}_2 ∧  b^{30, 35}_1 ∧  b^{30, 35}_0 ∧ true) 
c  in CNF:
c     b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ false 
c  in DIMACS:
 15119 -15120 -15121  0
c  -3 does not represent an automaton state.
c    -( b^{30, 35}_2 ∧  b^{30, 35}_1 ∧  b^{30, 35}_0 ∧ true) 
c  in CNF:
c    -b^{30, 35}_2 ∨ -b^{30, 35}_1 ∨ -b^{30, 35}_0 ∨ false 
c  in DIMACS:
-15119 -15120 -15121  0

c i = 36
c  -2+1 --> -1
c    ( b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧  p_1080) -> ( b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0)
c  in CNF:
c    -b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨  b^{30, 37}_2
c    -b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_1
c    -b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨  b^{30, 37}_0
c  in DIMACS:
-15122 -15123  15124 -1080  15125 0
-15122 -15123  15124 -1080 -15126 0
-15122 -15123  15124 -1080  15127 0

c  -1+1 --> 0
c    ( b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0 ∧  p_1080) -> (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧ -b^{30, 37}_0)
c  in CNF:
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_2
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_1
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_0
c  in DIMACS:
-15122  15123 -15124 -1080 -15125 0
-15122  15123 -15124 -1080 -15126 0
-15122  15123 -15124 -1080 -15127 0

c  0+1 --> 1
c    (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧  p_1080) -> (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0)
c  in CNF:
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_2
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_1
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨  b^{30, 37}_0
c  in DIMACS:
 15122  15123  15124 -1080 -15125 0
 15122  15123  15124 -1080 -15126 0
 15122  15123  15124 -1080  15127 0

c  1+1 --> 2
c    (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0 ∧  p_1080) -> (-b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0)
c  in CNF:
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_2
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨  b^{30, 37}_1
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ -p_1080 ∨ -b^{30, 37}_0
c  in DIMACS:
 15122  15123 -15124 -1080 -15125 0
 15122  15123 -15124 -1080  15126 0
 15122  15123 -15124 -1080 -15127 0

c  2+1 --> break 
c    (-b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 15122 -15123  15124 -1080 1162 0


c  2-1 --> 1
c    (-b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧ -p_1080) -> (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0)
c  in CNF:
c     b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_2
c     b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_1
c     b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨  b^{30, 37}_0
c  in DIMACS:
 15122 -15123  15124  1080 -15125 0
 15122 -15123  15124  1080 -15126 0
 15122 -15123  15124  1080  15127 0

c  1-1 --> 0
c    (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0 ∧ -p_1080) -> (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧ -b^{30, 37}_0)
c  in CNF:
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_2
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_1
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_0
c  in DIMACS:
 15122  15123 -15124  1080 -15125 0
 15122  15123 -15124  1080 -15126 0
 15122  15123 -15124  1080 -15127 0

c  0-1 --> -1
c    (-b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧ -p_1080) -> ( b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0)
c  in CNF:
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨  b^{30, 37}_2
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_1
c     b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨  b^{30, 37}_0
c  in DIMACS:
 15122  15123  15124  1080  15125 0
 15122  15123  15124  1080 -15126 0
 15122  15123  15124  1080  15127 0

c  -1-1 --> -2
c    ( b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧  b^{30, 36}_0 ∧ -p_1080) -> ( b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0)
c  in CNF:
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨  b^{30, 37}_2
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨  b^{30, 37}_1
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨  p_1080 ∨ -b^{30, 37}_0
c  in DIMACS:
-15122  15123 -15124  1080  15125 0
-15122  15123 -15124  1080  15126 0
-15122  15123 -15124  1080 -15127 0

c  -2-1 --> break 
c    ( b^{30, 36}_2 ∧  b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨  b^{30, 36}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-15122 -15123  15124  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 36}_2 ∧ -b^{30, 36}_1 ∧ -b^{30, 36}_0 ∧ true) 
c  in CNF:
c    -b^{30, 36}_2 ∨  b^{30, 36}_1 ∨  b^{30, 36}_0 ∨ false 
c  in DIMACS:
-15122  15123  15124  0

c  3 does not represent an automaton state.
c    -(-b^{30, 36}_2 ∧  b^{30, 36}_1 ∧  b^{30, 36}_0 ∧ true) 
c  in CNF:
c     b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ false 
c  in DIMACS:
 15122 -15123 -15124  0
c  -3 does not represent an automaton state.
c    -( b^{30, 36}_2 ∧  b^{30, 36}_1 ∧  b^{30, 36}_0 ∧ true) 
c  in CNF:
c    -b^{30, 36}_2 ∨ -b^{30, 36}_1 ∨ -b^{30, 36}_0 ∨ false 
c  in DIMACS:
-15122 -15123 -15124  0

c i = 37
c  -2+1 --> -1
c    ( b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧  p_1110) -> ( b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0)
c  in CNF:
c    -b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨  b^{30, 38}_2
c    -b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_1
c    -b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨  b^{30, 38}_0
c  in DIMACS:
-15125 -15126  15127 -1110  15128 0
-15125 -15126  15127 -1110 -15129 0
-15125 -15126  15127 -1110  15130 0

c  -1+1 --> 0
c    ( b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0 ∧  p_1110) -> (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧ -b^{30, 38}_0)
c  in CNF:
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_2
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_1
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_0
c  in DIMACS:
-15125  15126 -15127 -1110 -15128 0
-15125  15126 -15127 -1110 -15129 0
-15125  15126 -15127 -1110 -15130 0

c  0+1 --> 1
c    (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧  p_1110) -> (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0)
c  in CNF:
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_2
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_1
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨  b^{30, 38}_0
c  in DIMACS:
 15125  15126  15127 -1110 -15128 0
 15125  15126  15127 -1110 -15129 0
 15125  15126  15127 -1110  15130 0

c  1+1 --> 2
c    (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0 ∧  p_1110) -> (-b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0)
c  in CNF:
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_2
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨  b^{30, 38}_1
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ -p_1110 ∨ -b^{30, 38}_0
c  in DIMACS:
 15125  15126 -15127 -1110 -15128 0
 15125  15126 -15127 -1110  15129 0
 15125  15126 -15127 -1110 -15130 0

c  2+1 --> break 
c    (-b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 15125 -15126  15127 -1110 1162 0


c  2-1 --> 1
c    (-b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧ -p_1110) -> (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0)
c  in CNF:
c     b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_2
c     b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_1
c     b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨  b^{30, 38}_0
c  in DIMACS:
 15125 -15126  15127  1110 -15128 0
 15125 -15126  15127  1110 -15129 0
 15125 -15126  15127  1110  15130 0

c  1-1 --> 0
c    (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0 ∧ -p_1110) -> (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧ -b^{30, 38}_0)
c  in CNF:
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_2
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_1
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_0
c  in DIMACS:
 15125  15126 -15127  1110 -15128 0
 15125  15126 -15127  1110 -15129 0
 15125  15126 -15127  1110 -15130 0

c  0-1 --> -1
c    (-b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧ -p_1110) -> ( b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0)
c  in CNF:
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨  b^{30, 38}_2
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_1
c     b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨  b^{30, 38}_0
c  in DIMACS:
 15125  15126  15127  1110  15128 0
 15125  15126  15127  1110 -15129 0
 15125  15126  15127  1110  15130 0

c  -1-1 --> -2
c    ( b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧  b^{30, 37}_0 ∧ -p_1110) -> ( b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0)
c  in CNF:
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨  b^{30, 38}_2
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨  b^{30, 38}_1
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨  p_1110 ∨ -b^{30, 38}_0
c  in DIMACS:
-15125  15126 -15127  1110  15128 0
-15125  15126 -15127  1110  15129 0
-15125  15126 -15127  1110 -15130 0

c  -2-1 --> break 
c    ( b^{30, 37}_2 ∧  b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨  b^{30, 37}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-15125 -15126  15127  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 37}_2 ∧ -b^{30, 37}_1 ∧ -b^{30, 37}_0 ∧ true) 
c  in CNF:
c    -b^{30, 37}_2 ∨  b^{30, 37}_1 ∨  b^{30, 37}_0 ∨ false 
c  in DIMACS:
-15125  15126  15127  0

c  3 does not represent an automaton state.
c    -(-b^{30, 37}_2 ∧  b^{30, 37}_1 ∧  b^{30, 37}_0 ∧ true) 
c  in CNF:
c     b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ false 
c  in DIMACS:
 15125 -15126 -15127  0
c  -3 does not represent an automaton state.
c    -( b^{30, 37}_2 ∧  b^{30, 37}_1 ∧  b^{30, 37}_0 ∧ true) 
c  in CNF:
c    -b^{30, 37}_2 ∨ -b^{30, 37}_1 ∨ -b^{30, 37}_0 ∨ false 
c  in DIMACS:
-15125 -15126 -15127  0

c i = 38
c  -2+1 --> -1
c    ( b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧  p_1140) -> ( b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧  b^{30, 39}_0)
c  in CNF:
c    -b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨  b^{30, 39}_2
c    -b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_1
c    -b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨  b^{30, 39}_0
c  in DIMACS:
-15128 -15129  15130 -1140  15131 0
-15128 -15129  15130 -1140 -15132 0
-15128 -15129  15130 -1140  15133 0

c  -1+1 --> 0
c    ( b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0 ∧  p_1140) -> (-b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧ -b^{30, 39}_0)
c  in CNF:
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_2
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_1
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_0
c  in DIMACS:
-15128  15129 -15130 -1140 -15131 0
-15128  15129 -15130 -1140 -15132 0
-15128  15129 -15130 -1140 -15133 0

c  0+1 --> 1
c    (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧  p_1140) -> (-b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧  b^{30, 39}_0)
c  in CNF:
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_2
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_1
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨  b^{30, 39}_0
c  in DIMACS:
 15128  15129  15130 -1140 -15131 0
 15128  15129  15130 -1140 -15132 0
 15128  15129  15130 -1140  15133 0

c  1+1 --> 2
c    (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0 ∧  p_1140) -> (-b^{30, 39}_2 ∧  b^{30, 39}_1 ∧ -b^{30, 39}_0)
c  in CNF:
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_2
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨  b^{30, 39}_1
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ -p_1140 ∨ -b^{30, 39}_0
c  in DIMACS:
 15128  15129 -15130 -1140 -15131 0
 15128  15129 -15130 -1140  15132 0
 15128  15129 -15130 -1140 -15133 0

c  2+1 --> break 
c    (-b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 15128 -15129  15130 -1140 1162 0


c  2-1 --> 1
c    (-b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧ -p_1140) -> (-b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧  b^{30, 39}_0)
c  in CNF:
c     b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_2
c     b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_1
c     b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨  b^{30, 39}_0
c  in DIMACS:
 15128 -15129  15130  1140 -15131 0
 15128 -15129  15130  1140 -15132 0
 15128 -15129  15130  1140  15133 0

c  1-1 --> 0
c    (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0 ∧ -p_1140) -> (-b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧ -b^{30, 39}_0)
c  in CNF:
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_2
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_1
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_0
c  in DIMACS:
 15128  15129 -15130  1140 -15131 0
 15128  15129 -15130  1140 -15132 0
 15128  15129 -15130  1140 -15133 0

c  0-1 --> -1
c    (-b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧ -p_1140) -> ( b^{30, 39}_2 ∧ -b^{30, 39}_1 ∧  b^{30, 39}_0)
c  in CNF:
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨  b^{30, 39}_2
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_1
c     b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨  b^{30, 39}_0
c  in DIMACS:
 15128  15129  15130  1140  15131 0
 15128  15129  15130  1140 -15132 0
 15128  15129  15130  1140  15133 0

c  -1-1 --> -2
c    ( b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧  b^{30, 38}_0 ∧ -p_1140) -> ( b^{30, 39}_2 ∧  b^{30, 39}_1 ∧ -b^{30, 39}_0)
c  in CNF:
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨  b^{30, 39}_2
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨  b^{30, 39}_1
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨  p_1140 ∨ -b^{30, 39}_0
c  in DIMACS:
-15128  15129 -15130  1140  15131 0
-15128  15129 -15130  1140  15132 0
-15128  15129 -15130  1140 -15133 0

c  -2-1 --> break 
c    ( b^{30, 38}_2 ∧  b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨  b^{30, 38}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-15128 -15129  15130  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{30, 38}_2 ∧ -b^{30, 38}_1 ∧ -b^{30, 38}_0 ∧ true) 
c  in CNF:
c    -b^{30, 38}_2 ∨  b^{30, 38}_1 ∨  b^{30, 38}_0 ∨ false 
c  in DIMACS:
-15128  15129  15130  0

c  3 does not represent an automaton state.
c    -(-b^{30, 38}_2 ∧  b^{30, 38}_1 ∧  b^{30, 38}_0 ∧ true) 
c  in CNF:
c     b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ false 
c  in DIMACS:
 15128 -15129 -15130  0
c  -3 does not represent an automaton state.
c    -( b^{30, 38}_2 ∧  b^{30, 38}_1 ∧  b^{30, 38}_0 ∧ true) 
c  in CNF:
c    -b^{30, 38}_2 ∨ -b^{30, 38}_1 ∨ -b^{30, 38}_0 ∨ false 
c  in DIMACS:
-15128 -15129 -15130  0

c INIT for k = 31
c    -b^{31, 1}_2
c    -b^{31, 1}_1
c    -b^{31, 1}_0
c  in DIMACS:
-15134 0
-15135 0
-15136 0

c Transitions for k = 31
c i = 1
c  -2+1 --> -1
c    ( b^{31, 1}_2 ∧  b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧  p_31) -> ( b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0)
c  in CNF:
c    -b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨  b^{31, 2}_2
c    -b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_1
c    -b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨  b^{31, 2}_0
c  in DIMACS:
-15134 -15135  15136 -31  15137 0
-15134 -15135  15136 -31 -15138 0
-15134 -15135  15136 -31  15139 0

c  -1+1 --> 0
c    ( b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧  b^{31, 1}_0 ∧  p_31) -> (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧ -b^{31, 2}_0)
c  in CNF:
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_2
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_1
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_0
c  in DIMACS:
-15134  15135 -15136 -31 -15137 0
-15134  15135 -15136 -31 -15138 0
-15134  15135 -15136 -31 -15139 0

c  0+1 --> 1
c    (-b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧  p_31) -> (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0)
c  in CNF:
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_2
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_1
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨  b^{31, 2}_0
c  in DIMACS:
 15134  15135  15136 -31 -15137 0
 15134  15135  15136 -31 -15138 0
 15134  15135  15136 -31  15139 0

c  1+1 --> 2
c    (-b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧  b^{31, 1}_0 ∧  p_31) -> (-b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0)
c  in CNF:
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_2
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨  b^{31, 2}_1
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ -p_31 ∨ -b^{31, 2}_0
c  in DIMACS:
 15134  15135 -15136 -31 -15137 0
 15134  15135 -15136 -31  15138 0
 15134  15135 -15136 -31 -15139 0

c  2+1 --> break 
c    (-b^{31, 1}_2 ∧  b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧  p_31) -> break
c  in CNF:
c     b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ -p_31 ∨ break
c  in DIMACS:
 15134 -15135  15136 -31 1162 0


c  2-1 --> 1
c    (-b^{31, 1}_2 ∧  b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧ -p_31) -> (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0)
c  in CNF:
c     b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_2
c     b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_1
c     b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨  b^{31, 2}_0
c  in DIMACS:
 15134 -15135  15136  31 -15137 0
 15134 -15135  15136  31 -15138 0
 15134 -15135  15136  31  15139 0

c  1-1 --> 0
c    (-b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧  b^{31, 1}_0 ∧ -p_31) -> (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧ -b^{31, 2}_0)
c  in CNF:
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_2
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_1
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_0
c  in DIMACS:
 15134  15135 -15136  31 -15137 0
 15134  15135 -15136  31 -15138 0
 15134  15135 -15136  31 -15139 0

c  0-1 --> -1
c    (-b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧ -p_31) -> ( b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0)
c  in CNF:
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨  b^{31, 2}_2
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_1
c     b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨  b^{31, 2}_0
c  in DIMACS:
 15134  15135  15136  31  15137 0
 15134  15135  15136  31 -15138 0
 15134  15135  15136  31  15139 0

c  -1-1 --> -2
c    ( b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧  b^{31, 1}_0 ∧ -p_31) -> ( b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0)
c  in CNF:
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨  b^{31, 2}_2
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨  b^{31, 2}_1
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨  p_31 ∨ -b^{31, 2}_0
c  in DIMACS:
-15134  15135 -15136  31  15137 0
-15134  15135 -15136  31  15138 0
-15134  15135 -15136  31 -15139 0

c  -2-1 --> break 
c    ( b^{31, 1}_2 ∧  b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧ -p_31) -> break
c  in CNF:
c    -b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨  b^{31, 1}_0 ∨  p_31 ∨ break
c  in DIMACS:
-15134 -15135  15136  31 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 1}_2 ∧ -b^{31, 1}_1 ∧ -b^{31, 1}_0 ∧ true) 
c  in CNF:
c    -b^{31, 1}_2 ∨  b^{31, 1}_1 ∨  b^{31, 1}_0 ∨ false 
c  in DIMACS:
-15134  15135  15136  0

c  3 does not represent an automaton state.
c    -(-b^{31, 1}_2 ∧  b^{31, 1}_1 ∧  b^{31, 1}_0 ∧ true) 
c  in CNF:
c     b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ false 
c  in DIMACS:
 15134 -15135 -15136  0
c  -3 does not represent an automaton state.
c    -( b^{31, 1}_2 ∧  b^{31, 1}_1 ∧  b^{31, 1}_0 ∧ true) 
c  in CNF:
c    -b^{31, 1}_2 ∨ -b^{31, 1}_1 ∨ -b^{31, 1}_0 ∨ false 
c  in DIMACS:
-15134 -15135 -15136  0

c i = 2
c  -2+1 --> -1
c    ( b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧  p_62) -> ( b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0)
c  in CNF:
c    -b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨  b^{31, 3}_2
c    -b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_1
c    -b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨  b^{31, 3}_0
c  in DIMACS:
-15137 -15138  15139 -62  15140 0
-15137 -15138  15139 -62 -15141 0
-15137 -15138  15139 -62  15142 0

c  -1+1 --> 0
c    ( b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0 ∧  p_62) -> (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧ -b^{31, 3}_0)
c  in CNF:
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_2
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_1
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_0
c  in DIMACS:
-15137  15138 -15139 -62 -15140 0
-15137  15138 -15139 -62 -15141 0
-15137  15138 -15139 -62 -15142 0

c  0+1 --> 1
c    (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧  p_62) -> (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0)
c  in CNF:
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_2
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_1
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨  b^{31, 3}_0
c  in DIMACS:
 15137  15138  15139 -62 -15140 0
 15137  15138  15139 -62 -15141 0
 15137  15138  15139 -62  15142 0

c  1+1 --> 2
c    (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0 ∧  p_62) -> (-b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0)
c  in CNF:
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_2
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨  b^{31, 3}_1
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ -p_62 ∨ -b^{31, 3}_0
c  in DIMACS:
 15137  15138 -15139 -62 -15140 0
 15137  15138 -15139 -62  15141 0
 15137  15138 -15139 -62 -15142 0

c  2+1 --> break 
c    (-b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧  p_62) -> break
c  in CNF:
c     b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ -p_62 ∨ break
c  in DIMACS:
 15137 -15138  15139 -62 1162 0


c  2-1 --> 1
c    (-b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧ -p_62) -> (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0)
c  in CNF:
c     b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_2
c     b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_1
c     b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨  b^{31, 3}_0
c  in DIMACS:
 15137 -15138  15139  62 -15140 0
 15137 -15138  15139  62 -15141 0
 15137 -15138  15139  62  15142 0

c  1-1 --> 0
c    (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0 ∧ -p_62) -> (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧ -b^{31, 3}_0)
c  in CNF:
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_2
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_1
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_0
c  in DIMACS:
 15137  15138 -15139  62 -15140 0
 15137  15138 -15139  62 -15141 0
 15137  15138 -15139  62 -15142 0

c  0-1 --> -1
c    (-b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧ -p_62) -> ( b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0)
c  in CNF:
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨  b^{31, 3}_2
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_1
c     b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨  b^{31, 3}_0
c  in DIMACS:
 15137  15138  15139  62  15140 0
 15137  15138  15139  62 -15141 0
 15137  15138  15139  62  15142 0

c  -1-1 --> -2
c    ( b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧  b^{31, 2}_0 ∧ -p_62) -> ( b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0)
c  in CNF:
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨  b^{31, 3}_2
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨  b^{31, 3}_1
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨  p_62 ∨ -b^{31, 3}_0
c  in DIMACS:
-15137  15138 -15139  62  15140 0
-15137  15138 -15139  62  15141 0
-15137  15138 -15139  62 -15142 0

c  -2-1 --> break 
c    ( b^{31, 2}_2 ∧  b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧ -p_62) -> break
c  in CNF:
c    -b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨  b^{31, 2}_0 ∨  p_62 ∨ break
c  in DIMACS:
-15137 -15138  15139  62 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 2}_2 ∧ -b^{31, 2}_1 ∧ -b^{31, 2}_0 ∧ true) 
c  in CNF:
c    -b^{31, 2}_2 ∨  b^{31, 2}_1 ∨  b^{31, 2}_0 ∨ false 
c  in DIMACS:
-15137  15138  15139  0

c  3 does not represent an automaton state.
c    -(-b^{31, 2}_2 ∧  b^{31, 2}_1 ∧  b^{31, 2}_0 ∧ true) 
c  in CNF:
c     b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ false 
c  in DIMACS:
 15137 -15138 -15139  0
c  -3 does not represent an automaton state.
c    -( b^{31, 2}_2 ∧  b^{31, 2}_1 ∧  b^{31, 2}_0 ∧ true) 
c  in CNF:
c    -b^{31, 2}_2 ∨ -b^{31, 2}_1 ∨ -b^{31, 2}_0 ∨ false 
c  in DIMACS:
-15137 -15138 -15139  0

c i = 3
c  -2+1 --> -1
c    ( b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧  p_93) -> ( b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0)
c  in CNF:
c    -b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨  b^{31, 4}_2
c    -b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_1
c    -b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨  b^{31, 4}_0
c  in DIMACS:
-15140 -15141  15142 -93  15143 0
-15140 -15141  15142 -93 -15144 0
-15140 -15141  15142 -93  15145 0

c  -1+1 --> 0
c    ( b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0 ∧  p_93) -> (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧ -b^{31, 4}_0)
c  in CNF:
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_2
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_1
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_0
c  in DIMACS:
-15140  15141 -15142 -93 -15143 0
-15140  15141 -15142 -93 -15144 0
-15140  15141 -15142 -93 -15145 0

c  0+1 --> 1
c    (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧  p_93) -> (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0)
c  in CNF:
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_2
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_1
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨  b^{31, 4}_0
c  in DIMACS:
 15140  15141  15142 -93 -15143 0
 15140  15141  15142 -93 -15144 0
 15140  15141  15142 -93  15145 0

c  1+1 --> 2
c    (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0 ∧  p_93) -> (-b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0)
c  in CNF:
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_2
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨  b^{31, 4}_1
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ -p_93 ∨ -b^{31, 4}_0
c  in DIMACS:
 15140  15141 -15142 -93 -15143 0
 15140  15141 -15142 -93  15144 0
 15140  15141 -15142 -93 -15145 0

c  2+1 --> break 
c    (-b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧  p_93) -> break
c  in CNF:
c     b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ -p_93 ∨ break
c  in DIMACS:
 15140 -15141  15142 -93 1162 0


c  2-1 --> 1
c    (-b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧ -p_93) -> (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0)
c  in CNF:
c     b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_2
c     b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_1
c     b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨  b^{31, 4}_0
c  in DIMACS:
 15140 -15141  15142  93 -15143 0
 15140 -15141  15142  93 -15144 0
 15140 -15141  15142  93  15145 0

c  1-1 --> 0
c    (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0 ∧ -p_93) -> (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧ -b^{31, 4}_0)
c  in CNF:
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_2
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_1
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_0
c  in DIMACS:
 15140  15141 -15142  93 -15143 0
 15140  15141 -15142  93 -15144 0
 15140  15141 -15142  93 -15145 0

c  0-1 --> -1
c    (-b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧ -p_93) -> ( b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0)
c  in CNF:
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨  b^{31, 4}_2
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_1
c     b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨  b^{31, 4}_0
c  in DIMACS:
 15140  15141  15142  93  15143 0
 15140  15141  15142  93 -15144 0
 15140  15141  15142  93  15145 0

c  -1-1 --> -2
c    ( b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧  b^{31, 3}_0 ∧ -p_93) -> ( b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0)
c  in CNF:
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨  b^{31, 4}_2
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨  b^{31, 4}_1
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨  p_93 ∨ -b^{31, 4}_0
c  in DIMACS:
-15140  15141 -15142  93  15143 0
-15140  15141 -15142  93  15144 0
-15140  15141 -15142  93 -15145 0

c  -2-1 --> break 
c    ( b^{31, 3}_2 ∧  b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧ -p_93) -> break
c  in CNF:
c    -b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨  b^{31, 3}_0 ∨  p_93 ∨ break
c  in DIMACS:
-15140 -15141  15142  93 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 3}_2 ∧ -b^{31, 3}_1 ∧ -b^{31, 3}_0 ∧ true) 
c  in CNF:
c    -b^{31, 3}_2 ∨  b^{31, 3}_1 ∨  b^{31, 3}_0 ∨ false 
c  in DIMACS:
-15140  15141  15142  0

c  3 does not represent an automaton state.
c    -(-b^{31, 3}_2 ∧  b^{31, 3}_1 ∧  b^{31, 3}_0 ∧ true) 
c  in CNF:
c     b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ false 
c  in DIMACS:
 15140 -15141 -15142  0
c  -3 does not represent an automaton state.
c    -( b^{31, 3}_2 ∧  b^{31, 3}_1 ∧  b^{31, 3}_0 ∧ true) 
c  in CNF:
c    -b^{31, 3}_2 ∨ -b^{31, 3}_1 ∨ -b^{31, 3}_0 ∨ false 
c  in DIMACS:
-15140 -15141 -15142  0

c i = 4
c  -2+1 --> -1
c    ( b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧  p_124) -> ( b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0)
c  in CNF:
c    -b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨  b^{31, 5}_2
c    -b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_1
c    -b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨  b^{31, 5}_0
c  in DIMACS:
-15143 -15144  15145 -124  15146 0
-15143 -15144  15145 -124 -15147 0
-15143 -15144  15145 -124  15148 0

c  -1+1 --> 0
c    ( b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0 ∧  p_124) -> (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧ -b^{31, 5}_0)
c  in CNF:
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_2
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_1
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_0
c  in DIMACS:
-15143  15144 -15145 -124 -15146 0
-15143  15144 -15145 -124 -15147 0
-15143  15144 -15145 -124 -15148 0

c  0+1 --> 1
c    (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧  p_124) -> (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0)
c  in CNF:
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_2
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_1
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨  b^{31, 5}_0
c  in DIMACS:
 15143  15144  15145 -124 -15146 0
 15143  15144  15145 -124 -15147 0
 15143  15144  15145 -124  15148 0

c  1+1 --> 2
c    (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0 ∧  p_124) -> (-b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0)
c  in CNF:
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_2
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨  b^{31, 5}_1
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ -p_124 ∨ -b^{31, 5}_0
c  in DIMACS:
 15143  15144 -15145 -124 -15146 0
 15143  15144 -15145 -124  15147 0
 15143  15144 -15145 -124 -15148 0

c  2+1 --> break 
c    (-b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧  p_124) -> break
c  in CNF:
c     b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 15143 -15144  15145 -124 1162 0


c  2-1 --> 1
c    (-b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧ -p_124) -> (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0)
c  in CNF:
c     b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_2
c     b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_1
c     b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨  b^{31, 5}_0
c  in DIMACS:
 15143 -15144  15145  124 -15146 0
 15143 -15144  15145  124 -15147 0
 15143 -15144  15145  124  15148 0

c  1-1 --> 0
c    (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0 ∧ -p_124) -> (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧ -b^{31, 5}_0)
c  in CNF:
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_2
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_1
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_0
c  in DIMACS:
 15143  15144 -15145  124 -15146 0
 15143  15144 -15145  124 -15147 0
 15143  15144 -15145  124 -15148 0

c  0-1 --> -1
c    (-b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧ -p_124) -> ( b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0)
c  in CNF:
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨  b^{31, 5}_2
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_1
c     b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨  b^{31, 5}_0
c  in DIMACS:
 15143  15144  15145  124  15146 0
 15143  15144  15145  124 -15147 0
 15143  15144  15145  124  15148 0

c  -1-1 --> -2
c    ( b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧  b^{31, 4}_0 ∧ -p_124) -> ( b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0)
c  in CNF:
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨  b^{31, 5}_2
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨  b^{31, 5}_1
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨  p_124 ∨ -b^{31, 5}_0
c  in DIMACS:
-15143  15144 -15145  124  15146 0
-15143  15144 -15145  124  15147 0
-15143  15144 -15145  124 -15148 0

c  -2-1 --> break 
c    ( b^{31, 4}_2 ∧  b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨  b^{31, 4}_0 ∨  p_124 ∨ break
c  in DIMACS:
-15143 -15144  15145  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 4}_2 ∧ -b^{31, 4}_1 ∧ -b^{31, 4}_0 ∧ true) 
c  in CNF:
c    -b^{31, 4}_2 ∨  b^{31, 4}_1 ∨  b^{31, 4}_0 ∨ false 
c  in DIMACS:
-15143  15144  15145  0

c  3 does not represent an automaton state.
c    -(-b^{31, 4}_2 ∧  b^{31, 4}_1 ∧  b^{31, 4}_0 ∧ true) 
c  in CNF:
c     b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ false 
c  in DIMACS:
 15143 -15144 -15145  0
c  -3 does not represent an automaton state.
c    -( b^{31, 4}_2 ∧  b^{31, 4}_1 ∧  b^{31, 4}_0 ∧ true) 
c  in CNF:
c    -b^{31, 4}_2 ∨ -b^{31, 4}_1 ∨ -b^{31, 4}_0 ∨ false 
c  in DIMACS:
-15143 -15144 -15145  0

c i = 5
c  -2+1 --> -1
c    ( b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧  p_155) -> ( b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0)
c  in CNF:
c    -b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨  b^{31, 6}_2
c    -b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_1
c    -b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨  b^{31, 6}_0
c  in DIMACS:
-15146 -15147  15148 -155  15149 0
-15146 -15147  15148 -155 -15150 0
-15146 -15147  15148 -155  15151 0

c  -1+1 --> 0
c    ( b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0 ∧  p_155) -> (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧ -b^{31, 6}_0)
c  in CNF:
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_2
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_1
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_0
c  in DIMACS:
-15146  15147 -15148 -155 -15149 0
-15146  15147 -15148 -155 -15150 0
-15146  15147 -15148 -155 -15151 0

c  0+1 --> 1
c    (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧  p_155) -> (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0)
c  in CNF:
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_2
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_1
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨  b^{31, 6}_0
c  in DIMACS:
 15146  15147  15148 -155 -15149 0
 15146  15147  15148 -155 -15150 0
 15146  15147  15148 -155  15151 0

c  1+1 --> 2
c    (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0 ∧  p_155) -> (-b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0)
c  in CNF:
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_2
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨  b^{31, 6}_1
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ -p_155 ∨ -b^{31, 6}_0
c  in DIMACS:
 15146  15147 -15148 -155 -15149 0
 15146  15147 -15148 -155  15150 0
 15146  15147 -15148 -155 -15151 0

c  2+1 --> break 
c    (-b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧  p_155) -> break
c  in CNF:
c     b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ -p_155 ∨ break
c  in DIMACS:
 15146 -15147  15148 -155 1162 0


c  2-1 --> 1
c    (-b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧ -p_155) -> (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0)
c  in CNF:
c     b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_2
c     b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_1
c     b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨  b^{31, 6}_0
c  in DIMACS:
 15146 -15147  15148  155 -15149 0
 15146 -15147  15148  155 -15150 0
 15146 -15147  15148  155  15151 0

c  1-1 --> 0
c    (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0 ∧ -p_155) -> (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧ -b^{31, 6}_0)
c  in CNF:
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_2
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_1
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_0
c  in DIMACS:
 15146  15147 -15148  155 -15149 0
 15146  15147 -15148  155 -15150 0
 15146  15147 -15148  155 -15151 0

c  0-1 --> -1
c    (-b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧ -p_155) -> ( b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0)
c  in CNF:
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨  b^{31, 6}_2
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_1
c     b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨  b^{31, 6}_0
c  in DIMACS:
 15146  15147  15148  155  15149 0
 15146  15147  15148  155 -15150 0
 15146  15147  15148  155  15151 0

c  -1-1 --> -2
c    ( b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧  b^{31, 5}_0 ∧ -p_155) -> ( b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0)
c  in CNF:
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨  b^{31, 6}_2
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨  b^{31, 6}_1
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨  p_155 ∨ -b^{31, 6}_0
c  in DIMACS:
-15146  15147 -15148  155  15149 0
-15146  15147 -15148  155  15150 0
-15146  15147 -15148  155 -15151 0

c  -2-1 --> break 
c    ( b^{31, 5}_2 ∧  b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧ -p_155) -> break
c  in CNF:
c    -b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨  b^{31, 5}_0 ∨  p_155 ∨ break
c  in DIMACS:
-15146 -15147  15148  155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 5}_2 ∧ -b^{31, 5}_1 ∧ -b^{31, 5}_0 ∧ true) 
c  in CNF:
c    -b^{31, 5}_2 ∨  b^{31, 5}_1 ∨  b^{31, 5}_0 ∨ false 
c  in DIMACS:
-15146  15147  15148  0

c  3 does not represent an automaton state.
c    -(-b^{31, 5}_2 ∧  b^{31, 5}_1 ∧  b^{31, 5}_0 ∧ true) 
c  in CNF:
c     b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ false 
c  in DIMACS:
 15146 -15147 -15148  0
c  -3 does not represent an automaton state.
c    -( b^{31, 5}_2 ∧  b^{31, 5}_1 ∧  b^{31, 5}_0 ∧ true) 
c  in CNF:
c    -b^{31, 5}_2 ∨ -b^{31, 5}_1 ∨ -b^{31, 5}_0 ∨ false 
c  in DIMACS:
-15146 -15147 -15148  0

c i = 6
c  -2+1 --> -1
c    ( b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧  p_186) -> ( b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0)
c  in CNF:
c    -b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨  b^{31, 7}_2
c    -b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_1
c    -b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨  b^{31, 7}_0
c  in DIMACS:
-15149 -15150  15151 -186  15152 0
-15149 -15150  15151 -186 -15153 0
-15149 -15150  15151 -186  15154 0

c  -1+1 --> 0
c    ( b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0 ∧  p_186) -> (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧ -b^{31, 7}_0)
c  in CNF:
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_2
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_1
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_0
c  in DIMACS:
-15149  15150 -15151 -186 -15152 0
-15149  15150 -15151 -186 -15153 0
-15149  15150 -15151 -186 -15154 0

c  0+1 --> 1
c    (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧  p_186) -> (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0)
c  in CNF:
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_2
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_1
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨  b^{31, 7}_0
c  in DIMACS:
 15149  15150  15151 -186 -15152 0
 15149  15150  15151 -186 -15153 0
 15149  15150  15151 -186  15154 0

c  1+1 --> 2
c    (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0 ∧  p_186) -> (-b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0)
c  in CNF:
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_2
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨  b^{31, 7}_1
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ -p_186 ∨ -b^{31, 7}_0
c  in DIMACS:
 15149  15150 -15151 -186 -15152 0
 15149  15150 -15151 -186  15153 0
 15149  15150 -15151 -186 -15154 0

c  2+1 --> break 
c    (-b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧  p_186) -> break
c  in CNF:
c     b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 15149 -15150  15151 -186 1162 0


c  2-1 --> 1
c    (-b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧ -p_186) -> (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0)
c  in CNF:
c     b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_2
c     b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_1
c     b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨  b^{31, 7}_0
c  in DIMACS:
 15149 -15150  15151  186 -15152 0
 15149 -15150  15151  186 -15153 0
 15149 -15150  15151  186  15154 0

c  1-1 --> 0
c    (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0 ∧ -p_186) -> (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧ -b^{31, 7}_0)
c  in CNF:
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_2
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_1
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_0
c  in DIMACS:
 15149  15150 -15151  186 -15152 0
 15149  15150 -15151  186 -15153 0
 15149  15150 -15151  186 -15154 0

c  0-1 --> -1
c    (-b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧ -p_186) -> ( b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0)
c  in CNF:
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨  b^{31, 7}_2
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_1
c     b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨  b^{31, 7}_0
c  in DIMACS:
 15149  15150  15151  186  15152 0
 15149  15150  15151  186 -15153 0
 15149  15150  15151  186  15154 0

c  -1-1 --> -2
c    ( b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧  b^{31, 6}_0 ∧ -p_186) -> ( b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0)
c  in CNF:
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨  b^{31, 7}_2
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨  b^{31, 7}_1
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨  p_186 ∨ -b^{31, 7}_0
c  in DIMACS:
-15149  15150 -15151  186  15152 0
-15149  15150 -15151  186  15153 0
-15149  15150 -15151  186 -15154 0

c  -2-1 --> break 
c    ( b^{31, 6}_2 ∧  b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨  b^{31, 6}_0 ∨  p_186 ∨ break
c  in DIMACS:
-15149 -15150  15151  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 6}_2 ∧ -b^{31, 6}_1 ∧ -b^{31, 6}_0 ∧ true) 
c  in CNF:
c    -b^{31, 6}_2 ∨  b^{31, 6}_1 ∨  b^{31, 6}_0 ∨ false 
c  in DIMACS:
-15149  15150  15151  0

c  3 does not represent an automaton state.
c    -(-b^{31, 6}_2 ∧  b^{31, 6}_1 ∧  b^{31, 6}_0 ∧ true) 
c  in CNF:
c     b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ false 
c  in DIMACS:
 15149 -15150 -15151  0
c  -3 does not represent an automaton state.
c    -( b^{31, 6}_2 ∧  b^{31, 6}_1 ∧  b^{31, 6}_0 ∧ true) 
c  in CNF:
c    -b^{31, 6}_2 ∨ -b^{31, 6}_1 ∨ -b^{31, 6}_0 ∨ false 
c  in DIMACS:
-15149 -15150 -15151  0

c i = 7
c  -2+1 --> -1
c    ( b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧  p_217) -> ( b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0)
c  in CNF:
c    -b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨  b^{31, 8}_2
c    -b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_1
c    -b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨  b^{31, 8}_0
c  in DIMACS:
-15152 -15153  15154 -217  15155 0
-15152 -15153  15154 -217 -15156 0
-15152 -15153  15154 -217  15157 0

c  -1+1 --> 0
c    ( b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0 ∧  p_217) -> (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧ -b^{31, 8}_0)
c  in CNF:
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_2
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_1
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_0
c  in DIMACS:
-15152  15153 -15154 -217 -15155 0
-15152  15153 -15154 -217 -15156 0
-15152  15153 -15154 -217 -15157 0

c  0+1 --> 1
c    (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧  p_217) -> (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0)
c  in CNF:
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_2
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_1
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨  b^{31, 8}_0
c  in DIMACS:
 15152  15153  15154 -217 -15155 0
 15152  15153  15154 -217 -15156 0
 15152  15153  15154 -217  15157 0

c  1+1 --> 2
c    (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0 ∧  p_217) -> (-b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0)
c  in CNF:
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_2
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨  b^{31, 8}_1
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ -p_217 ∨ -b^{31, 8}_0
c  in DIMACS:
 15152  15153 -15154 -217 -15155 0
 15152  15153 -15154 -217  15156 0
 15152  15153 -15154 -217 -15157 0

c  2+1 --> break 
c    (-b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧  p_217) -> break
c  in CNF:
c     b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ -p_217 ∨ break
c  in DIMACS:
 15152 -15153  15154 -217 1162 0


c  2-1 --> 1
c    (-b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧ -p_217) -> (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0)
c  in CNF:
c     b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_2
c     b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_1
c     b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨  b^{31, 8}_0
c  in DIMACS:
 15152 -15153  15154  217 -15155 0
 15152 -15153  15154  217 -15156 0
 15152 -15153  15154  217  15157 0

c  1-1 --> 0
c    (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0 ∧ -p_217) -> (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧ -b^{31, 8}_0)
c  in CNF:
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_2
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_1
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_0
c  in DIMACS:
 15152  15153 -15154  217 -15155 0
 15152  15153 -15154  217 -15156 0
 15152  15153 -15154  217 -15157 0

c  0-1 --> -1
c    (-b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧ -p_217) -> ( b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0)
c  in CNF:
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨  b^{31, 8}_2
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_1
c     b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨  b^{31, 8}_0
c  in DIMACS:
 15152  15153  15154  217  15155 0
 15152  15153  15154  217 -15156 0
 15152  15153  15154  217  15157 0

c  -1-1 --> -2
c    ( b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧  b^{31, 7}_0 ∧ -p_217) -> ( b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0)
c  in CNF:
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨  b^{31, 8}_2
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨  b^{31, 8}_1
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨  p_217 ∨ -b^{31, 8}_0
c  in DIMACS:
-15152  15153 -15154  217  15155 0
-15152  15153 -15154  217  15156 0
-15152  15153 -15154  217 -15157 0

c  -2-1 --> break 
c    ( b^{31, 7}_2 ∧  b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧ -p_217) -> break
c  in CNF:
c    -b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨  b^{31, 7}_0 ∨  p_217 ∨ break
c  in DIMACS:
-15152 -15153  15154  217 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 7}_2 ∧ -b^{31, 7}_1 ∧ -b^{31, 7}_0 ∧ true) 
c  in CNF:
c    -b^{31, 7}_2 ∨  b^{31, 7}_1 ∨  b^{31, 7}_0 ∨ false 
c  in DIMACS:
-15152  15153  15154  0

c  3 does not represent an automaton state.
c    -(-b^{31, 7}_2 ∧  b^{31, 7}_1 ∧  b^{31, 7}_0 ∧ true) 
c  in CNF:
c     b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ false 
c  in DIMACS:
 15152 -15153 -15154  0
c  -3 does not represent an automaton state.
c    -( b^{31, 7}_2 ∧  b^{31, 7}_1 ∧  b^{31, 7}_0 ∧ true) 
c  in CNF:
c    -b^{31, 7}_2 ∨ -b^{31, 7}_1 ∨ -b^{31, 7}_0 ∨ false 
c  in DIMACS:
-15152 -15153 -15154  0

c i = 8
c  -2+1 --> -1
c    ( b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧  p_248) -> ( b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0)
c  in CNF:
c    -b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨  b^{31, 9}_2
c    -b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_1
c    -b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨  b^{31, 9}_0
c  in DIMACS:
-15155 -15156  15157 -248  15158 0
-15155 -15156  15157 -248 -15159 0
-15155 -15156  15157 -248  15160 0

c  -1+1 --> 0
c    ( b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0 ∧  p_248) -> (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧ -b^{31, 9}_0)
c  in CNF:
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_2
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_1
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_0
c  in DIMACS:
-15155  15156 -15157 -248 -15158 0
-15155  15156 -15157 -248 -15159 0
-15155  15156 -15157 -248 -15160 0

c  0+1 --> 1
c    (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧  p_248) -> (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0)
c  in CNF:
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_2
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_1
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨  b^{31, 9}_0
c  in DIMACS:
 15155  15156  15157 -248 -15158 0
 15155  15156  15157 -248 -15159 0
 15155  15156  15157 -248  15160 0

c  1+1 --> 2
c    (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0 ∧  p_248) -> (-b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0)
c  in CNF:
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_2
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨  b^{31, 9}_1
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ -p_248 ∨ -b^{31, 9}_0
c  in DIMACS:
 15155  15156 -15157 -248 -15158 0
 15155  15156 -15157 -248  15159 0
 15155  15156 -15157 -248 -15160 0

c  2+1 --> break 
c    (-b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧  p_248) -> break
c  in CNF:
c     b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 15155 -15156  15157 -248 1162 0


c  2-1 --> 1
c    (-b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧ -p_248) -> (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0)
c  in CNF:
c     b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_2
c     b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_1
c     b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨  b^{31, 9}_0
c  in DIMACS:
 15155 -15156  15157  248 -15158 0
 15155 -15156  15157  248 -15159 0
 15155 -15156  15157  248  15160 0

c  1-1 --> 0
c    (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0 ∧ -p_248) -> (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧ -b^{31, 9}_0)
c  in CNF:
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_2
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_1
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_0
c  in DIMACS:
 15155  15156 -15157  248 -15158 0
 15155  15156 -15157  248 -15159 0
 15155  15156 -15157  248 -15160 0

c  0-1 --> -1
c    (-b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧ -p_248) -> ( b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0)
c  in CNF:
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨  b^{31, 9}_2
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_1
c     b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨  b^{31, 9}_0
c  in DIMACS:
 15155  15156  15157  248  15158 0
 15155  15156  15157  248 -15159 0
 15155  15156  15157  248  15160 0

c  -1-1 --> -2
c    ( b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧  b^{31, 8}_0 ∧ -p_248) -> ( b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0)
c  in CNF:
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨  b^{31, 9}_2
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨  b^{31, 9}_1
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨  p_248 ∨ -b^{31, 9}_0
c  in DIMACS:
-15155  15156 -15157  248  15158 0
-15155  15156 -15157  248  15159 0
-15155  15156 -15157  248 -15160 0

c  -2-1 --> break 
c    ( b^{31, 8}_2 ∧  b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨  b^{31, 8}_0 ∨  p_248 ∨ break
c  in DIMACS:
-15155 -15156  15157  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 8}_2 ∧ -b^{31, 8}_1 ∧ -b^{31, 8}_0 ∧ true) 
c  in CNF:
c    -b^{31, 8}_2 ∨  b^{31, 8}_1 ∨  b^{31, 8}_0 ∨ false 
c  in DIMACS:
-15155  15156  15157  0

c  3 does not represent an automaton state.
c    -(-b^{31, 8}_2 ∧  b^{31, 8}_1 ∧  b^{31, 8}_0 ∧ true) 
c  in CNF:
c     b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ false 
c  in DIMACS:
 15155 -15156 -15157  0
c  -3 does not represent an automaton state.
c    -( b^{31, 8}_2 ∧  b^{31, 8}_1 ∧  b^{31, 8}_0 ∧ true) 
c  in CNF:
c    -b^{31, 8}_2 ∨ -b^{31, 8}_1 ∨ -b^{31, 8}_0 ∨ false 
c  in DIMACS:
-15155 -15156 -15157  0

c i = 9
c  -2+1 --> -1
c    ( b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧  p_279) -> ( b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0)
c  in CNF:
c    -b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨  b^{31, 10}_2
c    -b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_1
c    -b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨  b^{31, 10}_0
c  in DIMACS:
-15158 -15159  15160 -279  15161 0
-15158 -15159  15160 -279 -15162 0
-15158 -15159  15160 -279  15163 0

c  -1+1 --> 0
c    ( b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0 ∧  p_279) -> (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧ -b^{31, 10}_0)
c  in CNF:
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_2
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_1
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_0
c  in DIMACS:
-15158  15159 -15160 -279 -15161 0
-15158  15159 -15160 -279 -15162 0
-15158  15159 -15160 -279 -15163 0

c  0+1 --> 1
c    (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧  p_279) -> (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0)
c  in CNF:
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_2
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_1
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨  b^{31, 10}_0
c  in DIMACS:
 15158  15159  15160 -279 -15161 0
 15158  15159  15160 -279 -15162 0
 15158  15159  15160 -279  15163 0

c  1+1 --> 2
c    (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0 ∧  p_279) -> (-b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0)
c  in CNF:
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_2
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨  b^{31, 10}_1
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ -p_279 ∨ -b^{31, 10}_0
c  in DIMACS:
 15158  15159 -15160 -279 -15161 0
 15158  15159 -15160 -279  15162 0
 15158  15159 -15160 -279 -15163 0

c  2+1 --> break 
c    (-b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧  p_279) -> break
c  in CNF:
c     b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 15158 -15159  15160 -279 1162 0


c  2-1 --> 1
c    (-b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧ -p_279) -> (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0)
c  in CNF:
c     b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_2
c     b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_1
c     b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨  b^{31, 10}_0
c  in DIMACS:
 15158 -15159  15160  279 -15161 0
 15158 -15159  15160  279 -15162 0
 15158 -15159  15160  279  15163 0

c  1-1 --> 0
c    (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0 ∧ -p_279) -> (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧ -b^{31, 10}_0)
c  in CNF:
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_2
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_1
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_0
c  in DIMACS:
 15158  15159 -15160  279 -15161 0
 15158  15159 -15160  279 -15162 0
 15158  15159 -15160  279 -15163 0

c  0-1 --> -1
c    (-b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧ -p_279) -> ( b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0)
c  in CNF:
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨  b^{31, 10}_2
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_1
c     b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨  b^{31, 10}_0
c  in DIMACS:
 15158  15159  15160  279  15161 0
 15158  15159  15160  279 -15162 0
 15158  15159  15160  279  15163 0

c  -1-1 --> -2
c    ( b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧  b^{31, 9}_0 ∧ -p_279) -> ( b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0)
c  in CNF:
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨  b^{31, 10}_2
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨  b^{31, 10}_1
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨  p_279 ∨ -b^{31, 10}_0
c  in DIMACS:
-15158  15159 -15160  279  15161 0
-15158  15159 -15160  279  15162 0
-15158  15159 -15160  279 -15163 0

c  -2-1 --> break 
c    ( b^{31, 9}_2 ∧  b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨  b^{31, 9}_0 ∨  p_279 ∨ break
c  in DIMACS:
-15158 -15159  15160  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 9}_2 ∧ -b^{31, 9}_1 ∧ -b^{31, 9}_0 ∧ true) 
c  in CNF:
c    -b^{31, 9}_2 ∨  b^{31, 9}_1 ∨  b^{31, 9}_0 ∨ false 
c  in DIMACS:
-15158  15159  15160  0

c  3 does not represent an automaton state.
c    -(-b^{31, 9}_2 ∧  b^{31, 9}_1 ∧  b^{31, 9}_0 ∧ true) 
c  in CNF:
c     b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ false 
c  in DIMACS:
 15158 -15159 -15160  0
c  -3 does not represent an automaton state.
c    -( b^{31, 9}_2 ∧  b^{31, 9}_1 ∧  b^{31, 9}_0 ∧ true) 
c  in CNF:
c    -b^{31, 9}_2 ∨ -b^{31, 9}_1 ∨ -b^{31, 9}_0 ∨ false 
c  in DIMACS:
-15158 -15159 -15160  0

c i = 10
c  -2+1 --> -1
c    ( b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧  p_310) -> ( b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0)
c  in CNF:
c    -b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨  b^{31, 11}_2
c    -b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_1
c    -b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨  b^{31, 11}_0
c  in DIMACS:
-15161 -15162  15163 -310  15164 0
-15161 -15162  15163 -310 -15165 0
-15161 -15162  15163 -310  15166 0

c  -1+1 --> 0
c    ( b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0 ∧  p_310) -> (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧ -b^{31, 11}_0)
c  in CNF:
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_2
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_1
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_0
c  in DIMACS:
-15161  15162 -15163 -310 -15164 0
-15161  15162 -15163 -310 -15165 0
-15161  15162 -15163 -310 -15166 0

c  0+1 --> 1
c    (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧  p_310) -> (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0)
c  in CNF:
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_2
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_1
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨  b^{31, 11}_0
c  in DIMACS:
 15161  15162  15163 -310 -15164 0
 15161  15162  15163 -310 -15165 0
 15161  15162  15163 -310  15166 0

c  1+1 --> 2
c    (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0 ∧  p_310) -> (-b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0)
c  in CNF:
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_2
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨  b^{31, 11}_1
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ -p_310 ∨ -b^{31, 11}_0
c  in DIMACS:
 15161  15162 -15163 -310 -15164 0
 15161  15162 -15163 -310  15165 0
 15161  15162 -15163 -310 -15166 0

c  2+1 --> break 
c    (-b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧  p_310) -> break
c  in CNF:
c     b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 15161 -15162  15163 -310 1162 0


c  2-1 --> 1
c    (-b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧ -p_310) -> (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0)
c  in CNF:
c     b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_2
c     b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_1
c     b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨  b^{31, 11}_0
c  in DIMACS:
 15161 -15162  15163  310 -15164 0
 15161 -15162  15163  310 -15165 0
 15161 -15162  15163  310  15166 0

c  1-1 --> 0
c    (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0 ∧ -p_310) -> (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧ -b^{31, 11}_0)
c  in CNF:
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_2
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_1
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_0
c  in DIMACS:
 15161  15162 -15163  310 -15164 0
 15161  15162 -15163  310 -15165 0
 15161  15162 -15163  310 -15166 0

c  0-1 --> -1
c    (-b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧ -p_310) -> ( b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0)
c  in CNF:
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨  b^{31, 11}_2
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_1
c     b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨  b^{31, 11}_0
c  in DIMACS:
 15161  15162  15163  310  15164 0
 15161  15162  15163  310 -15165 0
 15161  15162  15163  310  15166 0

c  -1-1 --> -2
c    ( b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧  b^{31, 10}_0 ∧ -p_310) -> ( b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0)
c  in CNF:
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨  b^{31, 11}_2
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨  b^{31, 11}_1
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨  p_310 ∨ -b^{31, 11}_0
c  in DIMACS:
-15161  15162 -15163  310  15164 0
-15161  15162 -15163  310  15165 0
-15161  15162 -15163  310 -15166 0

c  -2-1 --> break 
c    ( b^{31, 10}_2 ∧  b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨  b^{31, 10}_0 ∨  p_310 ∨ break
c  in DIMACS:
-15161 -15162  15163  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 10}_2 ∧ -b^{31, 10}_1 ∧ -b^{31, 10}_0 ∧ true) 
c  in CNF:
c    -b^{31, 10}_2 ∨  b^{31, 10}_1 ∨  b^{31, 10}_0 ∨ false 
c  in DIMACS:
-15161  15162  15163  0

c  3 does not represent an automaton state.
c    -(-b^{31, 10}_2 ∧  b^{31, 10}_1 ∧  b^{31, 10}_0 ∧ true) 
c  in CNF:
c     b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ false 
c  in DIMACS:
 15161 -15162 -15163  0
c  -3 does not represent an automaton state.
c    -( b^{31, 10}_2 ∧  b^{31, 10}_1 ∧  b^{31, 10}_0 ∧ true) 
c  in CNF:
c    -b^{31, 10}_2 ∨ -b^{31, 10}_1 ∨ -b^{31, 10}_0 ∨ false 
c  in DIMACS:
-15161 -15162 -15163  0

c i = 11
c  -2+1 --> -1
c    ( b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧  p_341) -> ( b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0)
c  in CNF:
c    -b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨  b^{31, 12}_2
c    -b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_1
c    -b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨  b^{31, 12}_0
c  in DIMACS:
-15164 -15165  15166 -341  15167 0
-15164 -15165  15166 -341 -15168 0
-15164 -15165  15166 -341  15169 0

c  -1+1 --> 0
c    ( b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0 ∧  p_341) -> (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧ -b^{31, 12}_0)
c  in CNF:
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_2
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_1
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_0
c  in DIMACS:
-15164  15165 -15166 -341 -15167 0
-15164  15165 -15166 -341 -15168 0
-15164  15165 -15166 -341 -15169 0

c  0+1 --> 1
c    (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧  p_341) -> (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0)
c  in CNF:
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_2
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_1
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨  b^{31, 12}_0
c  in DIMACS:
 15164  15165  15166 -341 -15167 0
 15164  15165  15166 -341 -15168 0
 15164  15165  15166 -341  15169 0

c  1+1 --> 2
c    (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0 ∧  p_341) -> (-b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0)
c  in CNF:
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_2
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨  b^{31, 12}_1
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ -p_341 ∨ -b^{31, 12}_0
c  in DIMACS:
 15164  15165 -15166 -341 -15167 0
 15164  15165 -15166 -341  15168 0
 15164  15165 -15166 -341 -15169 0

c  2+1 --> break 
c    (-b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧  p_341) -> break
c  in CNF:
c     b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ -p_341 ∨ break
c  in DIMACS:
 15164 -15165  15166 -341 1162 0


c  2-1 --> 1
c    (-b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧ -p_341) -> (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0)
c  in CNF:
c     b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_2
c     b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_1
c     b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨  b^{31, 12}_0
c  in DIMACS:
 15164 -15165  15166  341 -15167 0
 15164 -15165  15166  341 -15168 0
 15164 -15165  15166  341  15169 0

c  1-1 --> 0
c    (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0 ∧ -p_341) -> (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧ -b^{31, 12}_0)
c  in CNF:
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_2
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_1
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_0
c  in DIMACS:
 15164  15165 -15166  341 -15167 0
 15164  15165 -15166  341 -15168 0
 15164  15165 -15166  341 -15169 0

c  0-1 --> -1
c    (-b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧ -p_341) -> ( b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0)
c  in CNF:
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨  b^{31, 12}_2
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_1
c     b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨  b^{31, 12}_0
c  in DIMACS:
 15164  15165  15166  341  15167 0
 15164  15165  15166  341 -15168 0
 15164  15165  15166  341  15169 0

c  -1-1 --> -2
c    ( b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧  b^{31, 11}_0 ∧ -p_341) -> ( b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0)
c  in CNF:
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨  b^{31, 12}_2
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨  b^{31, 12}_1
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨  p_341 ∨ -b^{31, 12}_0
c  in DIMACS:
-15164  15165 -15166  341  15167 0
-15164  15165 -15166  341  15168 0
-15164  15165 -15166  341 -15169 0

c  -2-1 --> break 
c    ( b^{31, 11}_2 ∧  b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧ -p_341) -> break
c  in CNF:
c    -b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨  b^{31, 11}_0 ∨  p_341 ∨ break
c  in DIMACS:
-15164 -15165  15166  341 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 11}_2 ∧ -b^{31, 11}_1 ∧ -b^{31, 11}_0 ∧ true) 
c  in CNF:
c    -b^{31, 11}_2 ∨  b^{31, 11}_1 ∨  b^{31, 11}_0 ∨ false 
c  in DIMACS:
-15164  15165  15166  0

c  3 does not represent an automaton state.
c    -(-b^{31, 11}_2 ∧  b^{31, 11}_1 ∧  b^{31, 11}_0 ∧ true) 
c  in CNF:
c     b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ false 
c  in DIMACS:
 15164 -15165 -15166  0
c  -3 does not represent an automaton state.
c    -( b^{31, 11}_2 ∧  b^{31, 11}_1 ∧  b^{31, 11}_0 ∧ true) 
c  in CNF:
c    -b^{31, 11}_2 ∨ -b^{31, 11}_1 ∨ -b^{31, 11}_0 ∨ false 
c  in DIMACS:
-15164 -15165 -15166  0

c i = 12
c  -2+1 --> -1
c    ( b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧  p_372) -> ( b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0)
c  in CNF:
c    -b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨  b^{31, 13}_2
c    -b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_1
c    -b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨  b^{31, 13}_0
c  in DIMACS:
-15167 -15168  15169 -372  15170 0
-15167 -15168  15169 -372 -15171 0
-15167 -15168  15169 -372  15172 0

c  -1+1 --> 0
c    ( b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0 ∧  p_372) -> (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧ -b^{31, 13}_0)
c  in CNF:
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_2
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_1
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_0
c  in DIMACS:
-15167  15168 -15169 -372 -15170 0
-15167  15168 -15169 -372 -15171 0
-15167  15168 -15169 -372 -15172 0

c  0+1 --> 1
c    (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧  p_372) -> (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0)
c  in CNF:
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_2
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_1
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨  b^{31, 13}_0
c  in DIMACS:
 15167  15168  15169 -372 -15170 0
 15167  15168  15169 -372 -15171 0
 15167  15168  15169 -372  15172 0

c  1+1 --> 2
c    (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0 ∧  p_372) -> (-b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0)
c  in CNF:
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_2
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨  b^{31, 13}_1
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ -p_372 ∨ -b^{31, 13}_0
c  in DIMACS:
 15167  15168 -15169 -372 -15170 0
 15167  15168 -15169 -372  15171 0
 15167  15168 -15169 -372 -15172 0

c  2+1 --> break 
c    (-b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧  p_372) -> break
c  in CNF:
c     b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 15167 -15168  15169 -372 1162 0


c  2-1 --> 1
c    (-b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧ -p_372) -> (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0)
c  in CNF:
c     b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_2
c     b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_1
c     b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨  b^{31, 13}_0
c  in DIMACS:
 15167 -15168  15169  372 -15170 0
 15167 -15168  15169  372 -15171 0
 15167 -15168  15169  372  15172 0

c  1-1 --> 0
c    (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0 ∧ -p_372) -> (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧ -b^{31, 13}_0)
c  in CNF:
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_2
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_1
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_0
c  in DIMACS:
 15167  15168 -15169  372 -15170 0
 15167  15168 -15169  372 -15171 0
 15167  15168 -15169  372 -15172 0

c  0-1 --> -1
c    (-b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧ -p_372) -> ( b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0)
c  in CNF:
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨  b^{31, 13}_2
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_1
c     b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨  b^{31, 13}_0
c  in DIMACS:
 15167  15168  15169  372  15170 0
 15167  15168  15169  372 -15171 0
 15167  15168  15169  372  15172 0

c  -1-1 --> -2
c    ( b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧  b^{31, 12}_0 ∧ -p_372) -> ( b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0)
c  in CNF:
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨  b^{31, 13}_2
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨  b^{31, 13}_1
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨  p_372 ∨ -b^{31, 13}_0
c  in DIMACS:
-15167  15168 -15169  372  15170 0
-15167  15168 -15169  372  15171 0
-15167  15168 -15169  372 -15172 0

c  -2-1 --> break 
c    ( b^{31, 12}_2 ∧  b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨  b^{31, 12}_0 ∨  p_372 ∨ break
c  in DIMACS:
-15167 -15168  15169  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 12}_2 ∧ -b^{31, 12}_1 ∧ -b^{31, 12}_0 ∧ true) 
c  in CNF:
c    -b^{31, 12}_2 ∨  b^{31, 12}_1 ∨  b^{31, 12}_0 ∨ false 
c  in DIMACS:
-15167  15168  15169  0

c  3 does not represent an automaton state.
c    -(-b^{31, 12}_2 ∧  b^{31, 12}_1 ∧  b^{31, 12}_0 ∧ true) 
c  in CNF:
c     b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ false 
c  in DIMACS:
 15167 -15168 -15169  0
c  -3 does not represent an automaton state.
c    -( b^{31, 12}_2 ∧  b^{31, 12}_1 ∧  b^{31, 12}_0 ∧ true) 
c  in CNF:
c    -b^{31, 12}_2 ∨ -b^{31, 12}_1 ∨ -b^{31, 12}_0 ∨ false 
c  in DIMACS:
-15167 -15168 -15169  0

c i = 13
c  -2+1 --> -1
c    ( b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧  p_403) -> ( b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0)
c  in CNF:
c    -b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨  b^{31, 14}_2
c    -b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_1
c    -b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨  b^{31, 14}_0
c  in DIMACS:
-15170 -15171  15172 -403  15173 0
-15170 -15171  15172 -403 -15174 0
-15170 -15171  15172 -403  15175 0

c  -1+1 --> 0
c    ( b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0 ∧  p_403) -> (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧ -b^{31, 14}_0)
c  in CNF:
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_2
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_1
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_0
c  in DIMACS:
-15170  15171 -15172 -403 -15173 0
-15170  15171 -15172 -403 -15174 0
-15170  15171 -15172 -403 -15175 0

c  0+1 --> 1
c    (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧  p_403) -> (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0)
c  in CNF:
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_2
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_1
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨  b^{31, 14}_0
c  in DIMACS:
 15170  15171  15172 -403 -15173 0
 15170  15171  15172 -403 -15174 0
 15170  15171  15172 -403  15175 0

c  1+1 --> 2
c    (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0 ∧  p_403) -> (-b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0)
c  in CNF:
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_2
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨  b^{31, 14}_1
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ -p_403 ∨ -b^{31, 14}_0
c  in DIMACS:
 15170  15171 -15172 -403 -15173 0
 15170  15171 -15172 -403  15174 0
 15170  15171 -15172 -403 -15175 0

c  2+1 --> break 
c    (-b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧  p_403) -> break
c  in CNF:
c     b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ -p_403 ∨ break
c  in DIMACS:
 15170 -15171  15172 -403 1162 0


c  2-1 --> 1
c    (-b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧ -p_403) -> (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0)
c  in CNF:
c     b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_2
c     b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_1
c     b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨  b^{31, 14}_0
c  in DIMACS:
 15170 -15171  15172  403 -15173 0
 15170 -15171  15172  403 -15174 0
 15170 -15171  15172  403  15175 0

c  1-1 --> 0
c    (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0 ∧ -p_403) -> (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧ -b^{31, 14}_0)
c  in CNF:
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_2
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_1
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_0
c  in DIMACS:
 15170  15171 -15172  403 -15173 0
 15170  15171 -15172  403 -15174 0
 15170  15171 -15172  403 -15175 0

c  0-1 --> -1
c    (-b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧ -p_403) -> ( b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0)
c  in CNF:
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨  b^{31, 14}_2
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_1
c     b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨  b^{31, 14}_0
c  in DIMACS:
 15170  15171  15172  403  15173 0
 15170  15171  15172  403 -15174 0
 15170  15171  15172  403  15175 0

c  -1-1 --> -2
c    ( b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧  b^{31, 13}_0 ∧ -p_403) -> ( b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0)
c  in CNF:
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨  b^{31, 14}_2
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨  b^{31, 14}_1
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨  p_403 ∨ -b^{31, 14}_0
c  in DIMACS:
-15170  15171 -15172  403  15173 0
-15170  15171 -15172  403  15174 0
-15170  15171 -15172  403 -15175 0

c  -2-1 --> break 
c    ( b^{31, 13}_2 ∧  b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧ -p_403) -> break
c  in CNF:
c    -b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨  b^{31, 13}_0 ∨  p_403 ∨ break
c  in DIMACS:
-15170 -15171  15172  403 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 13}_2 ∧ -b^{31, 13}_1 ∧ -b^{31, 13}_0 ∧ true) 
c  in CNF:
c    -b^{31, 13}_2 ∨  b^{31, 13}_1 ∨  b^{31, 13}_0 ∨ false 
c  in DIMACS:
-15170  15171  15172  0

c  3 does not represent an automaton state.
c    -(-b^{31, 13}_2 ∧  b^{31, 13}_1 ∧  b^{31, 13}_0 ∧ true) 
c  in CNF:
c     b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ false 
c  in DIMACS:
 15170 -15171 -15172  0
c  -3 does not represent an automaton state.
c    -( b^{31, 13}_2 ∧  b^{31, 13}_1 ∧  b^{31, 13}_0 ∧ true) 
c  in CNF:
c    -b^{31, 13}_2 ∨ -b^{31, 13}_1 ∨ -b^{31, 13}_0 ∨ false 
c  in DIMACS:
-15170 -15171 -15172  0

c i = 14
c  -2+1 --> -1
c    ( b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧  p_434) -> ( b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0)
c  in CNF:
c    -b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨  b^{31, 15}_2
c    -b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_1
c    -b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨  b^{31, 15}_0
c  in DIMACS:
-15173 -15174  15175 -434  15176 0
-15173 -15174  15175 -434 -15177 0
-15173 -15174  15175 -434  15178 0

c  -1+1 --> 0
c    ( b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0 ∧  p_434) -> (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧ -b^{31, 15}_0)
c  in CNF:
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_2
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_1
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_0
c  in DIMACS:
-15173  15174 -15175 -434 -15176 0
-15173  15174 -15175 -434 -15177 0
-15173  15174 -15175 -434 -15178 0

c  0+1 --> 1
c    (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧  p_434) -> (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0)
c  in CNF:
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_2
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_1
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨  b^{31, 15}_0
c  in DIMACS:
 15173  15174  15175 -434 -15176 0
 15173  15174  15175 -434 -15177 0
 15173  15174  15175 -434  15178 0

c  1+1 --> 2
c    (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0 ∧  p_434) -> (-b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0)
c  in CNF:
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_2
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨  b^{31, 15}_1
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ -p_434 ∨ -b^{31, 15}_0
c  in DIMACS:
 15173  15174 -15175 -434 -15176 0
 15173  15174 -15175 -434  15177 0
 15173  15174 -15175 -434 -15178 0

c  2+1 --> break 
c    (-b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧  p_434) -> break
c  in CNF:
c     b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 15173 -15174  15175 -434 1162 0


c  2-1 --> 1
c    (-b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧ -p_434) -> (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0)
c  in CNF:
c     b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_2
c     b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_1
c     b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨  b^{31, 15}_0
c  in DIMACS:
 15173 -15174  15175  434 -15176 0
 15173 -15174  15175  434 -15177 0
 15173 -15174  15175  434  15178 0

c  1-1 --> 0
c    (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0 ∧ -p_434) -> (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧ -b^{31, 15}_0)
c  in CNF:
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_2
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_1
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_0
c  in DIMACS:
 15173  15174 -15175  434 -15176 0
 15173  15174 -15175  434 -15177 0
 15173  15174 -15175  434 -15178 0

c  0-1 --> -1
c    (-b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧ -p_434) -> ( b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0)
c  in CNF:
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨  b^{31, 15}_2
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_1
c     b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨  b^{31, 15}_0
c  in DIMACS:
 15173  15174  15175  434  15176 0
 15173  15174  15175  434 -15177 0
 15173  15174  15175  434  15178 0

c  -1-1 --> -2
c    ( b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧  b^{31, 14}_0 ∧ -p_434) -> ( b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0)
c  in CNF:
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨  b^{31, 15}_2
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨  b^{31, 15}_1
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨  p_434 ∨ -b^{31, 15}_0
c  in DIMACS:
-15173  15174 -15175  434  15176 0
-15173  15174 -15175  434  15177 0
-15173  15174 -15175  434 -15178 0

c  -2-1 --> break 
c    ( b^{31, 14}_2 ∧  b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨  b^{31, 14}_0 ∨  p_434 ∨ break
c  in DIMACS:
-15173 -15174  15175  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 14}_2 ∧ -b^{31, 14}_1 ∧ -b^{31, 14}_0 ∧ true) 
c  in CNF:
c    -b^{31, 14}_2 ∨  b^{31, 14}_1 ∨  b^{31, 14}_0 ∨ false 
c  in DIMACS:
-15173  15174  15175  0

c  3 does not represent an automaton state.
c    -(-b^{31, 14}_2 ∧  b^{31, 14}_1 ∧  b^{31, 14}_0 ∧ true) 
c  in CNF:
c     b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ false 
c  in DIMACS:
 15173 -15174 -15175  0
c  -3 does not represent an automaton state.
c    -( b^{31, 14}_2 ∧  b^{31, 14}_1 ∧  b^{31, 14}_0 ∧ true) 
c  in CNF:
c    -b^{31, 14}_2 ∨ -b^{31, 14}_1 ∨ -b^{31, 14}_0 ∨ false 
c  in DIMACS:
-15173 -15174 -15175  0

c i = 15
c  -2+1 --> -1
c    ( b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧  p_465) -> ( b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0)
c  in CNF:
c    -b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨  b^{31, 16}_2
c    -b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_1
c    -b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨  b^{31, 16}_0
c  in DIMACS:
-15176 -15177  15178 -465  15179 0
-15176 -15177  15178 -465 -15180 0
-15176 -15177  15178 -465  15181 0

c  -1+1 --> 0
c    ( b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0 ∧  p_465) -> (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧ -b^{31, 16}_0)
c  in CNF:
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_2
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_1
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_0
c  in DIMACS:
-15176  15177 -15178 -465 -15179 0
-15176  15177 -15178 -465 -15180 0
-15176  15177 -15178 -465 -15181 0

c  0+1 --> 1
c    (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧  p_465) -> (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0)
c  in CNF:
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_2
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_1
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨  b^{31, 16}_0
c  in DIMACS:
 15176  15177  15178 -465 -15179 0
 15176  15177  15178 -465 -15180 0
 15176  15177  15178 -465  15181 0

c  1+1 --> 2
c    (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0 ∧  p_465) -> (-b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0)
c  in CNF:
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_2
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨  b^{31, 16}_1
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ -p_465 ∨ -b^{31, 16}_0
c  in DIMACS:
 15176  15177 -15178 -465 -15179 0
 15176  15177 -15178 -465  15180 0
 15176  15177 -15178 -465 -15181 0

c  2+1 --> break 
c    (-b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧  p_465) -> break
c  in CNF:
c     b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 15176 -15177  15178 -465 1162 0


c  2-1 --> 1
c    (-b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧ -p_465) -> (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0)
c  in CNF:
c     b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_2
c     b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_1
c     b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨  b^{31, 16}_0
c  in DIMACS:
 15176 -15177  15178  465 -15179 0
 15176 -15177  15178  465 -15180 0
 15176 -15177  15178  465  15181 0

c  1-1 --> 0
c    (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0 ∧ -p_465) -> (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧ -b^{31, 16}_0)
c  in CNF:
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_2
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_1
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_0
c  in DIMACS:
 15176  15177 -15178  465 -15179 0
 15176  15177 -15178  465 -15180 0
 15176  15177 -15178  465 -15181 0

c  0-1 --> -1
c    (-b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧ -p_465) -> ( b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0)
c  in CNF:
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨  b^{31, 16}_2
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_1
c     b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨  b^{31, 16}_0
c  in DIMACS:
 15176  15177  15178  465  15179 0
 15176  15177  15178  465 -15180 0
 15176  15177  15178  465  15181 0

c  -1-1 --> -2
c    ( b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧  b^{31, 15}_0 ∧ -p_465) -> ( b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0)
c  in CNF:
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨  b^{31, 16}_2
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨  b^{31, 16}_1
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨  p_465 ∨ -b^{31, 16}_0
c  in DIMACS:
-15176  15177 -15178  465  15179 0
-15176  15177 -15178  465  15180 0
-15176  15177 -15178  465 -15181 0

c  -2-1 --> break 
c    ( b^{31, 15}_2 ∧  b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨  b^{31, 15}_0 ∨  p_465 ∨ break
c  in DIMACS:
-15176 -15177  15178  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 15}_2 ∧ -b^{31, 15}_1 ∧ -b^{31, 15}_0 ∧ true) 
c  in CNF:
c    -b^{31, 15}_2 ∨  b^{31, 15}_1 ∨  b^{31, 15}_0 ∨ false 
c  in DIMACS:
-15176  15177  15178  0

c  3 does not represent an automaton state.
c    -(-b^{31, 15}_2 ∧  b^{31, 15}_1 ∧  b^{31, 15}_0 ∧ true) 
c  in CNF:
c     b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ false 
c  in DIMACS:
 15176 -15177 -15178  0
c  -3 does not represent an automaton state.
c    -( b^{31, 15}_2 ∧  b^{31, 15}_1 ∧  b^{31, 15}_0 ∧ true) 
c  in CNF:
c    -b^{31, 15}_2 ∨ -b^{31, 15}_1 ∨ -b^{31, 15}_0 ∨ false 
c  in DIMACS:
-15176 -15177 -15178  0

c i = 16
c  -2+1 --> -1
c    ( b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧  p_496) -> ( b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0)
c  in CNF:
c    -b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨  b^{31, 17}_2
c    -b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_1
c    -b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨  b^{31, 17}_0
c  in DIMACS:
-15179 -15180  15181 -496  15182 0
-15179 -15180  15181 -496 -15183 0
-15179 -15180  15181 -496  15184 0

c  -1+1 --> 0
c    ( b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0 ∧  p_496) -> (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧ -b^{31, 17}_0)
c  in CNF:
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_2
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_1
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_0
c  in DIMACS:
-15179  15180 -15181 -496 -15182 0
-15179  15180 -15181 -496 -15183 0
-15179  15180 -15181 -496 -15184 0

c  0+1 --> 1
c    (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧  p_496) -> (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0)
c  in CNF:
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_2
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_1
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨  b^{31, 17}_0
c  in DIMACS:
 15179  15180  15181 -496 -15182 0
 15179  15180  15181 -496 -15183 0
 15179  15180  15181 -496  15184 0

c  1+1 --> 2
c    (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0 ∧  p_496) -> (-b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0)
c  in CNF:
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_2
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨  b^{31, 17}_1
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ -p_496 ∨ -b^{31, 17}_0
c  in DIMACS:
 15179  15180 -15181 -496 -15182 0
 15179  15180 -15181 -496  15183 0
 15179  15180 -15181 -496 -15184 0

c  2+1 --> break 
c    (-b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧  p_496) -> break
c  in CNF:
c     b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 15179 -15180  15181 -496 1162 0


c  2-1 --> 1
c    (-b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧ -p_496) -> (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0)
c  in CNF:
c     b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_2
c     b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_1
c     b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨  b^{31, 17}_0
c  in DIMACS:
 15179 -15180  15181  496 -15182 0
 15179 -15180  15181  496 -15183 0
 15179 -15180  15181  496  15184 0

c  1-1 --> 0
c    (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0 ∧ -p_496) -> (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧ -b^{31, 17}_0)
c  in CNF:
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_2
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_1
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_0
c  in DIMACS:
 15179  15180 -15181  496 -15182 0
 15179  15180 -15181  496 -15183 0
 15179  15180 -15181  496 -15184 0

c  0-1 --> -1
c    (-b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧ -p_496) -> ( b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0)
c  in CNF:
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨  b^{31, 17}_2
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_1
c     b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨  b^{31, 17}_0
c  in DIMACS:
 15179  15180  15181  496  15182 0
 15179  15180  15181  496 -15183 0
 15179  15180  15181  496  15184 0

c  -1-1 --> -2
c    ( b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧  b^{31, 16}_0 ∧ -p_496) -> ( b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0)
c  in CNF:
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨  b^{31, 17}_2
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨  b^{31, 17}_1
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨  p_496 ∨ -b^{31, 17}_0
c  in DIMACS:
-15179  15180 -15181  496  15182 0
-15179  15180 -15181  496  15183 0
-15179  15180 -15181  496 -15184 0

c  -2-1 --> break 
c    ( b^{31, 16}_2 ∧  b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨  b^{31, 16}_0 ∨  p_496 ∨ break
c  in DIMACS:
-15179 -15180  15181  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 16}_2 ∧ -b^{31, 16}_1 ∧ -b^{31, 16}_0 ∧ true) 
c  in CNF:
c    -b^{31, 16}_2 ∨  b^{31, 16}_1 ∨  b^{31, 16}_0 ∨ false 
c  in DIMACS:
-15179  15180  15181  0

c  3 does not represent an automaton state.
c    -(-b^{31, 16}_2 ∧  b^{31, 16}_1 ∧  b^{31, 16}_0 ∧ true) 
c  in CNF:
c     b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ false 
c  in DIMACS:
 15179 -15180 -15181  0
c  -3 does not represent an automaton state.
c    -( b^{31, 16}_2 ∧  b^{31, 16}_1 ∧  b^{31, 16}_0 ∧ true) 
c  in CNF:
c    -b^{31, 16}_2 ∨ -b^{31, 16}_1 ∨ -b^{31, 16}_0 ∨ false 
c  in DIMACS:
-15179 -15180 -15181  0

c i = 17
c  -2+1 --> -1
c    ( b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧  p_527) -> ( b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0)
c  in CNF:
c    -b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨  b^{31, 18}_2
c    -b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_1
c    -b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨  b^{31, 18}_0
c  in DIMACS:
-15182 -15183  15184 -527  15185 0
-15182 -15183  15184 -527 -15186 0
-15182 -15183  15184 -527  15187 0

c  -1+1 --> 0
c    ( b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0 ∧  p_527) -> (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧ -b^{31, 18}_0)
c  in CNF:
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_2
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_1
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_0
c  in DIMACS:
-15182  15183 -15184 -527 -15185 0
-15182  15183 -15184 -527 -15186 0
-15182  15183 -15184 -527 -15187 0

c  0+1 --> 1
c    (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧  p_527) -> (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0)
c  in CNF:
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_2
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_1
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨  b^{31, 18}_0
c  in DIMACS:
 15182  15183  15184 -527 -15185 0
 15182  15183  15184 -527 -15186 0
 15182  15183  15184 -527  15187 0

c  1+1 --> 2
c    (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0 ∧  p_527) -> (-b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0)
c  in CNF:
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_2
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨  b^{31, 18}_1
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ -p_527 ∨ -b^{31, 18}_0
c  in DIMACS:
 15182  15183 -15184 -527 -15185 0
 15182  15183 -15184 -527  15186 0
 15182  15183 -15184 -527 -15187 0

c  2+1 --> break 
c    (-b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧  p_527) -> break
c  in CNF:
c     b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ -p_527 ∨ break
c  in DIMACS:
 15182 -15183  15184 -527 1162 0


c  2-1 --> 1
c    (-b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧ -p_527) -> (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0)
c  in CNF:
c     b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_2
c     b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_1
c     b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨  b^{31, 18}_0
c  in DIMACS:
 15182 -15183  15184  527 -15185 0
 15182 -15183  15184  527 -15186 0
 15182 -15183  15184  527  15187 0

c  1-1 --> 0
c    (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0 ∧ -p_527) -> (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧ -b^{31, 18}_0)
c  in CNF:
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_2
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_1
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_0
c  in DIMACS:
 15182  15183 -15184  527 -15185 0
 15182  15183 -15184  527 -15186 0
 15182  15183 -15184  527 -15187 0

c  0-1 --> -1
c    (-b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧ -p_527) -> ( b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0)
c  in CNF:
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨  b^{31, 18}_2
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_1
c     b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨  b^{31, 18}_0
c  in DIMACS:
 15182  15183  15184  527  15185 0
 15182  15183  15184  527 -15186 0
 15182  15183  15184  527  15187 0

c  -1-1 --> -2
c    ( b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧  b^{31, 17}_0 ∧ -p_527) -> ( b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0)
c  in CNF:
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨  b^{31, 18}_2
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨  b^{31, 18}_1
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨  p_527 ∨ -b^{31, 18}_0
c  in DIMACS:
-15182  15183 -15184  527  15185 0
-15182  15183 -15184  527  15186 0
-15182  15183 -15184  527 -15187 0

c  -2-1 --> break 
c    ( b^{31, 17}_2 ∧  b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧ -p_527) -> break
c  in CNF:
c    -b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨  b^{31, 17}_0 ∨  p_527 ∨ break
c  in DIMACS:
-15182 -15183  15184  527 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 17}_2 ∧ -b^{31, 17}_1 ∧ -b^{31, 17}_0 ∧ true) 
c  in CNF:
c    -b^{31, 17}_2 ∨  b^{31, 17}_1 ∨  b^{31, 17}_0 ∨ false 
c  in DIMACS:
-15182  15183  15184  0

c  3 does not represent an automaton state.
c    -(-b^{31, 17}_2 ∧  b^{31, 17}_1 ∧  b^{31, 17}_0 ∧ true) 
c  in CNF:
c     b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ false 
c  in DIMACS:
 15182 -15183 -15184  0
c  -3 does not represent an automaton state.
c    -( b^{31, 17}_2 ∧  b^{31, 17}_1 ∧  b^{31, 17}_0 ∧ true) 
c  in CNF:
c    -b^{31, 17}_2 ∨ -b^{31, 17}_1 ∨ -b^{31, 17}_0 ∨ false 
c  in DIMACS:
-15182 -15183 -15184  0

c i = 18
c  -2+1 --> -1
c    ( b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧  p_558) -> ( b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0)
c  in CNF:
c    -b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨  b^{31, 19}_2
c    -b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_1
c    -b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨  b^{31, 19}_0
c  in DIMACS:
-15185 -15186  15187 -558  15188 0
-15185 -15186  15187 -558 -15189 0
-15185 -15186  15187 -558  15190 0

c  -1+1 --> 0
c    ( b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0 ∧  p_558) -> (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧ -b^{31, 19}_0)
c  in CNF:
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_2
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_1
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_0
c  in DIMACS:
-15185  15186 -15187 -558 -15188 0
-15185  15186 -15187 -558 -15189 0
-15185  15186 -15187 -558 -15190 0

c  0+1 --> 1
c    (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧  p_558) -> (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0)
c  in CNF:
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_2
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_1
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨  b^{31, 19}_0
c  in DIMACS:
 15185  15186  15187 -558 -15188 0
 15185  15186  15187 -558 -15189 0
 15185  15186  15187 -558  15190 0

c  1+1 --> 2
c    (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0 ∧  p_558) -> (-b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0)
c  in CNF:
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_2
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨  b^{31, 19}_1
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ -p_558 ∨ -b^{31, 19}_0
c  in DIMACS:
 15185  15186 -15187 -558 -15188 0
 15185  15186 -15187 -558  15189 0
 15185  15186 -15187 -558 -15190 0

c  2+1 --> break 
c    (-b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧  p_558) -> break
c  in CNF:
c     b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 15185 -15186  15187 -558 1162 0


c  2-1 --> 1
c    (-b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧ -p_558) -> (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0)
c  in CNF:
c     b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_2
c     b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_1
c     b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨  b^{31, 19}_0
c  in DIMACS:
 15185 -15186  15187  558 -15188 0
 15185 -15186  15187  558 -15189 0
 15185 -15186  15187  558  15190 0

c  1-1 --> 0
c    (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0 ∧ -p_558) -> (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧ -b^{31, 19}_0)
c  in CNF:
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_2
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_1
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_0
c  in DIMACS:
 15185  15186 -15187  558 -15188 0
 15185  15186 -15187  558 -15189 0
 15185  15186 -15187  558 -15190 0

c  0-1 --> -1
c    (-b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧ -p_558) -> ( b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0)
c  in CNF:
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨  b^{31, 19}_2
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_1
c     b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨  b^{31, 19}_0
c  in DIMACS:
 15185  15186  15187  558  15188 0
 15185  15186  15187  558 -15189 0
 15185  15186  15187  558  15190 0

c  -1-1 --> -2
c    ( b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧  b^{31, 18}_0 ∧ -p_558) -> ( b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0)
c  in CNF:
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨  b^{31, 19}_2
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨  b^{31, 19}_1
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨  p_558 ∨ -b^{31, 19}_0
c  in DIMACS:
-15185  15186 -15187  558  15188 0
-15185  15186 -15187  558  15189 0
-15185  15186 -15187  558 -15190 0

c  -2-1 --> break 
c    ( b^{31, 18}_2 ∧  b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨  b^{31, 18}_0 ∨  p_558 ∨ break
c  in DIMACS:
-15185 -15186  15187  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 18}_2 ∧ -b^{31, 18}_1 ∧ -b^{31, 18}_0 ∧ true) 
c  in CNF:
c    -b^{31, 18}_2 ∨  b^{31, 18}_1 ∨  b^{31, 18}_0 ∨ false 
c  in DIMACS:
-15185  15186  15187  0

c  3 does not represent an automaton state.
c    -(-b^{31, 18}_2 ∧  b^{31, 18}_1 ∧  b^{31, 18}_0 ∧ true) 
c  in CNF:
c     b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ false 
c  in DIMACS:
 15185 -15186 -15187  0
c  -3 does not represent an automaton state.
c    -( b^{31, 18}_2 ∧  b^{31, 18}_1 ∧  b^{31, 18}_0 ∧ true) 
c  in CNF:
c    -b^{31, 18}_2 ∨ -b^{31, 18}_1 ∨ -b^{31, 18}_0 ∨ false 
c  in DIMACS:
-15185 -15186 -15187  0

c i = 19
c  -2+1 --> -1
c    ( b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧  p_589) -> ( b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0)
c  in CNF:
c    -b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨  b^{31, 20}_2
c    -b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_1
c    -b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨  b^{31, 20}_0
c  in DIMACS:
-15188 -15189  15190 -589  15191 0
-15188 -15189  15190 -589 -15192 0
-15188 -15189  15190 -589  15193 0

c  -1+1 --> 0
c    ( b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0 ∧  p_589) -> (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧ -b^{31, 20}_0)
c  in CNF:
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_2
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_1
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_0
c  in DIMACS:
-15188  15189 -15190 -589 -15191 0
-15188  15189 -15190 -589 -15192 0
-15188  15189 -15190 -589 -15193 0

c  0+1 --> 1
c    (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧  p_589) -> (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0)
c  in CNF:
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_2
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_1
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨  b^{31, 20}_0
c  in DIMACS:
 15188  15189  15190 -589 -15191 0
 15188  15189  15190 -589 -15192 0
 15188  15189  15190 -589  15193 0

c  1+1 --> 2
c    (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0 ∧  p_589) -> (-b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0)
c  in CNF:
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_2
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨  b^{31, 20}_1
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ -p_589 ∨ -b^{31, 20}_0
c  in DIMACS:
 15188  15189 -15190 -589 -15191 0
 15188  15189 -15190 -589  15192 0
 15188  15189 -15190 -589 -15193 0

c  2+1 --> break 
c    (-b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧  p_589) -> break
c  in CNF:
c     b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ -p_589 ∨ break
c  in DIMACS:
 15188 -15189  15190 -589 1162 0


c  2-1 --> 1
c    (-b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧ -p_589) -> (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0)
c  in CNF:
c     b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_2
c     b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_1
c     b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨  b^{31, 20}_0
c  in DIMACS:
 15188 -15189  15190  589 -15191 0
 15188 -15189  15190  589 -15192 0
 15188 -15189  15190  589  15193 0

c  1-1 --> 0
c    (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0 ∧ -p_589) -> (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧ -b^{31, 20}_0)
c  in CNF:
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_2
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_1
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_0
c  in DIMACS:
 15188  15189 -15190  589 -15191 0
 15188  15189 -15190  589 -15192 0
 15188  15189 -15190  589 -15193 0

c  0-1 --> -1
c    (-b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧ -p_589) -> ( b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0)
c  in CNF:
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨  b^{31, 20}_2
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_1
c     b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨  b^{31, 20}_0
c  in DIMACS:
 15188  15189  15190  589  15191 0
 15188  15189  15190  589 -15192 0
 15188  15189  15190  589  15193 0

c  -1-1 --> -2
c    ( b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧  b^{31, 19}_0 ∧ -p_589) -> ( b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0)
c  in CNF:
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨  b^{31, 20}_2
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨  b^{31, 20}_1
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨  p_589 ∨ -b^{31, 20}_0
c  in DIMACS:
-15188  15189 -15190  589  15191 0
-15188  15189 -15190  589  15192 0
-15188  15189 -15190  589 -15193 0

c  -2-1 --> break 
c    ( b^{31, 19}_2 ∧  b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧ -p_589) -> break
c  in CNF:
c    -b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨  b^{31, 19}_0 ∨  p_589 ∨ break
c  in DIMACS:
-15188 -15189  15190  589 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 19}_2 ∧ -b^{31, 19}_1 ∧ -b^{31, 19}_0 ∧ true) 
c  in CNF:
c    -b^{31, 19}_2 ∨  b^{31, 19}_1 ∨  b^{31, 19}_0 ∨ false 
c  in DIMACS:
-15188  15189  15190  0

c  3 does not represent an automaton state.
c    -(-b^{31, 19}_2 ∧  b^{31, 19}_1 ∧  b^{31, 19}_0 ∧ true) 
c  in CNF:
c     b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ false 
c  in DIMACS:
 15188 -15189 -15190  0
c  -3 does not represent an automaton state.
c    -( b^{31, 19}_2 ∧  b^{31, 19}_1 ∧  b^{31, 19}_0 ∧ true) 
c  in CNF:
c    -b^{31, 19}_2 ∨ -b^{31, 19}_1 ∨ -b^{31, 19}_0 ∨ false 
c  in DIMACS:
-15188 -15189 -15190  0

c i = 20
c  -2+1 --> -1
c    ( b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧  p_620) -> ( b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0)
c  in CNF:
c    -b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨  b^{31, 21}_2
c    -b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_1
c    -b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨  b^{31, 21}_0
c  in DIMACS:
-15191 -15192  15193 -620  15194 0
-15191 -15192  15193 -620 -15195 0
-15191 -15192  15193 -620  15196 0

c  -1+1 --> 0
c    ( b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0 ∧  p_620) -> (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧ -b^{31, 21}_0)
c  in CNF:
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_2
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_1
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_0
c  in DIMACS:
-15191  15192 -15193 -620 -15194 0
-15191  15192 -15193 -620 -15195 0
-15191  15192 -15193 -620 -15196 0

c  0+1 --> 1
c    (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧  p_620) -> (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0)
c  in CNF:
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_2
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_1
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨  b^{31, 21}_0
c  in DIMACS:
 15191  15192  15193 -620 -15194 0
 15191  15192  15193 -620 -15195 0
 15191  15192  15193 -620  15196 0

c  1+1 --> 2
c    (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0 ∧  p_620) -> (-b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0)
c  in CNF:
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_2
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨  b^{31, 21}_1
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ -p_620 ∨ -b^{31, 21}_0
c  in DIMACS:
 15191  15192 -15193 -620 -15194 0
 15191  15192 -15193 -620  15195 0
 15191  15192 -15193 -620 -15196 0

c  2+1 --> break 
c    (-b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧  p_620) -> break
c  in CNF:
c     b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 15191 -15192  15193 -620 1162 0


c  2-1 --> 1
c    (-b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧ -p_620) -> (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0)
c  in CNF:
c     b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_2
c     b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_1
c     b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨  b^{31, 21}_0
c  in DIMACS:
 15191 -15192  15193  620 -15194 0
 15191 -15192  15193  620 -15195 0
 15191 -15192  15193  620  15196 0

c  1-1 --> 0
c    (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0 ∧ -p_620) -> (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧ -b^{31, 21}_0)
c  in CNF:
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_2
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_1
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_0
c  in DIMACS:
 15191  15192 -15193  620 -15194 0
 15191  15192 -15193  620 -15195 0
 15191  15192 -15193  620 -15196 0

c  0-1 --> -1
c    (-b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧ -p_620) -> ( b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0)
c  in CNF:
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨  b^{31, 21}_2
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_1
c     b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨  b^{31, 21}_0
c  in DIMACS:
 15191  15192  15193  620  15194 0
 15191  15192  15193  620 -15195 0
 15191  15192  15193  620  15196 0

c  -1-1 --> -2
c    ( b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧  b^{31, 20}_0 ∧ -p_620) -> ( b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0)
c  in CNF:
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨  b^{31, 21}_2
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨  b^{31, 21}_1
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨  p_620 ∨ -b^{31, 21}_0
c  in DIMACS:
-15191  15192 -15193  620  15194 0
-15191  15192 -15193  620  15195 0
-15191  15192 -15193  620 -15196 0

c  -2-1 --> break 
c    ( b^{31, 20}_2 ∧  b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨  b^{31, 20}_0 ∨  p_620 ∨ break
c  in DIMACS:
-15191 -15192  15193  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 20}_2 ∧ -b^{31, 20}_1 ∧ -b^{31, 20}_0 ∧ true) 
c  in CNF:
c    -b^{31, 20}_2 ∨  b^{31, 20}_1 ∨  b^{31, 20}_0 ∨ false 
c  in DIMACS:
-15191  15192  15193  0

c  3 does not represent an automaton state.
c    -(-b^{31, 20}_2 ∧  b^{31, 20}_1 ∧  b^{31, 20}_0 ∧ true) 
c  in CNF:
c     b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ false 
c  in DIMACS:
 15191 -15192 -15193  0
c  -3 does not represent an automaton state.
c    -( b^{31, 20}_2 ∧  b^{31, 20}_1 ∧  b^{31, 20}_0 ∧ true) 
c  in CNF:
c    -b^{31, 20}_2 ∨ -b^{31, 20}_1 ∨ -b^{31, 20}_0 ∨ false 
c  in DIMACS:
-15191 -15192 -15193  0

c i = 21
c  -2+1 --> -1
c    ( b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧  p_651) -> ( b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0)
c  in CNF:
c    -b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨  b^{31, 22}_2
c    -b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_1
c    -b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨  b^{31, 22}_0
c  in DIMACS:
-15194 -15195  15196 -651  15197 0
-15194 -15195  15196 -651 -15198 0
-15194 -15195  15196 -651  15199 0

c  -1+1 --> 0
c    ( b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0 ∧  p_651) -> (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧ -b^{31, 22}_0)
c  in CNF:
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_2
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_1
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_0
c  in DIMACS:
-15194  15195 -15196 -651 -15197 0
-15194  15195 -15196 -651 -15198 0
-15194  15195 -15196 -651 -15199 0

c  0+1 --> 1
c    (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧  p_651) -> (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0)
c  in CNF:
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_2
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_1
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨  b^{31, 22}_0
c  in DIMACS:
 15194  15195  15196 -651 -15197 0
 15194  15195  15196 -651 -15198 0
 15194  15195  15196 -651  15199 0

c  1+1 --> 2
c    (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0 ∧  p_651) -> (-b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0)
c  in CNF:
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_2
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨  b^{31, 22}_1
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ -p_651 ∨ -b^{31, 22}_0
c  in DIMACS:
 15194  15195 -15196 -651 -15197 0
 15194  15195 -15196 -651  15198 0
 15194  15195 -15196 -651 -15199 0

c  2+1 --> break 
c    (-b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧  p_651) -> break
c  in CNF:
c     b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 15194 -15195  15196 -651 1162 0


c  2-1 --> 1
c    (-b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧ -p_651) -> (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0)
c  in CNF:
c     b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_2
c     b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_1
c     b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨  b^{31, 22}_0
c  in DIMACS:
 15194 -15195  15196  651 -15197 0
 15194 -15195  15196  651 -15198 0
 15194 -15195  15196  651  15199 0

c  1-1 --> 0
c    (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0 ∧ -p_651) -> (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧ -b^{31, 22}_0)
c  in CNF:
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_2
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_1
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_0
c  in DIMACS:
 15194  15195 -15196  651 -15197 0
 15194  15195 -15196  651 -15198 0
 15194  15195 -15196  651 -15199 0

c  0-1 --> -1
c    (-b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧ -p_651) -> ( b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0)
c  in CNF:
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨  b^{31, 22}_2
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_1
c     b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨  b^{31, 22}_0
c  in DIMACS:
 15194  15195  15196  651  15197 0
 15194  15195  15196  651 -15198 0
 15194  15195  15196  651  15199 0

c  -1-1 --> -2
c    ( b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧  b^{31, 21}_0 ∧ -p_651) -> ( b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0)
c  in CNF:
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨  b^{31, 22}_2
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨  b^{31, 22}_1
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨  p_651 ∨ -b^{31, 22}_0
c  in DIMACS:
-15194  15195 -15196  651  15197 0
-15194  15195 -15196  651  15198 0
-15194  15195 -15196  651 -15199 0

c  -2-1 --> break 
c    ( b^{31, 21}_2 ∧  b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨  b^{31, 21}_0 ∨  p_651 ∨ break
c  in DIMACS:
-15194 -15195  15196  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 21}_2 ∧ -b^{31, 21}_1 ∧ -b^{31, 21}_0 ∧ true) 
c  in CNF:
c    -b^{31, 21}_2 ∨  b^{31, 21}_1 ∨  b^{31, 21}_0 ∨ false 
c  in DIMACS:
-15194  15195  15196  0

c  3 does not represent an automaton state.
c    -(-b^{31, 21}_2 ∧  b^{31, 21}_1 ∧  b^{31, 21}_0 ∧ true) 
c  in CNF:
c     b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ false 
c  in DIMACS:
 15194 -15195 -15196  0
c  -3 does not represent an automaton state.
c    -( b^{31, 21}_2 ∧  b^{31, 21}_1 ∧  b^{31, 21}_0 ∧ true) 
c  in CNF:
c    -b^{31, 21}_2 ∨ -b^{31, 21}_1 ∨ -b^{31, 21}_0 ∨ false 
c  in DIMACS:
-15194 -15195 -15196  0

c i = 22
c  -2+1 --> -1
c    ( b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧  p_682) -> ( b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0)
c  in CNF:
c    -b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨  b^{31, 23}_2
c    -b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_1
c    -b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨  b^{31, 23}_0
c  in DIMACS:
-15197 -15198  15199 -682  15200 0
-15197 -15198  15199 -682 -15201 0
-15197 -15198  15199 -682  15202 0

c  -1+1 --> 0
c    ( b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0 ∧  p_682) -> (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧ -b^{31, 23}_0)
c  in CNF:
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_2
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_1
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_0
c  in DIMACS:
-15197  15198 -15199 -682 -15200 0
-15197  15198 -15199 -682 -15201 0
-15197  15198 -15199 -682 -15202 0

c  0+1 --> 1
c    (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧  p_682) -> (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0)
c  in CNF:
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_2
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_1
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨  b^{31, 23}_0
c  in DIMACS:
 15197  15198  15199 -682 -15200 0
 15197  15198  15199 -682 -15201 0
 15197  15198  15199 -682  15202 0

c  1+1 --> 2
c    (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0 ∧  p_682) -> (-b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0)
c  in CNF:
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_2
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨  b^{31, 23}_1
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ -p_682 ∨ -b^{31, 23}_0
c  in DIMACS:
 15197  15198 -15199 -682 -15200 0
 15197  15198 -15199 -682  15201 0
 15197  15198 -15199 -682 -15202 0

c  2+1 --> break 
c    (-b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧  p_682) -> break
c  in CNF:
c     b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 15197 -15198  15199 -682 1162 0


c  2-1 --> 1
c    (-b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧ -p_682) -> (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0)
c  in CNF:
c     b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_2
c     b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_1
c     b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨  b^{31, 23}_0
c  in DIMACS:
 15197 -15198  15199  682 -15200 0
 15197 -15198  15199  682 -15201 0
 15197 -15198  15199  682  15202 0

c  1-1 --> 0
c    (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0 ∧ -p_682) -> (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧ -b^{31, 23}_0)
c  in CNF:
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_2
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_1
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_0
c  in DIMACS:
 15197  15198 -15199  682 -15200 0
 15197  15198 -15199  682 -15201 0
 15197  15198 -15199  682 -15202 0

c  0-1 --> -1
c    (-b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧ -p_682) -> ( b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0)
c  in CNF:
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨  b^{31, 23}_2
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_1
c     b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨  b^{31, 23}_0
c  in DIMACS:
 15197  15198  15199  682  15200 0
 15197  15198  15199  682 -15201 0
 15197  15198  15199  682  15202 0

c  -1-1 --> -2
c    ( b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧  b^{31, 22}_0 ∧ -p_682) -> ( b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0)
c  in CNF:
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨  b^{31, 23}_2
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨  b^{31, 23}_1
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨  p_682 ∨ -b^{31, 23}_0
c  in DIMACS:
-15197  15198 -15199  682  15200 0
-15197  15198 -15199  682  15201 0
-15197  15198 -15199  682 -15202 0

c  -2-1 --> break 
c    ( b^{31, 22}_2 ∧  b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨  b^{31, 22}_0 ∨  p_682 ∨ break
c  in DIMACS:
-15197 -15198  15199  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 22}_2 ∧ -b^{31, 22}_1 ∧ -b^{31, 22}_0 ∧ true) 
c  in CNF:
c    -b^{31, 22}_2 ∨  b^{31, 22}_1 ∨  b^{31, 22}_0 ∨ false 
c  in DIMACS:
-15197  15198  15199  0

c  3 does not represent an automaton state.
c    -(-b^{31, 22}_2 ∧  b^{31, 22}_1 ∧  b^{31, 22}_0 ∧ true) 
c  in CNF:
c     b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ false 
c  in DIMACS:
 15197 -15198 -15199  0
c  -3 does not represent an automaton state.
c    -( b^{31, 22}_2 ∧  b^{31, 22}_1 ∧  b^{31, 22}_0 ∧ true) 
c  in CNF:
c    -b^{31, 22}_2 ∨ -b^{31, 22}_1 ∨ -b^{31, 22}_0 ∨ false 
c  in DIMACS:
-15197 -15198 -15199  0

c i = 23
c  -2+1 --> -1
c    ( b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧  p_713) -> ( b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0)
c  in CNF:
c    -b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨  b^{31, 24}_2
c    -b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_1
c    -b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨  b^{31, 24}_0
c  in DIMACS:
-15200 -15201  15202 -713  15203 0
-15200 -15201  15202 -713 -15204 0
-15200 -15201  15202 -713  15205 0

c  -1+1 --> 0
c    ( b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0 ∧  p_713) -> (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧ -b^{31, 24}_0)
c  in CNF:
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_2
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_1
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_0
c  in DIMACS:
-15200  15201 -15202 -713 -15203 0
-15200  15201 -15202 -713 -15204 0
-15200  15201 -15202 -713 -15205 0

c  0+1 --> 1
c    (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧  p_713) -> (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0)
c  in CNF:
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_2
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_1
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨  b^{31, 24}_0
c  in DIMACS:
 15200  15201  15202 -713 -15203 0
 15200  15201  15202 -713 -15204 0
 15200  15201  15202 -713  15205 0

c  1+1 --> 2
c    (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0 ∧  p_713) -> (-b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0)
c  in CNF:
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_2
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨  b^{31, 24}_1
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ -p_713 ∨ -b^{31, 24}_0
c  in DIMACS:
 15200  15201 -15202 -713 -15203 0
 15200  15201 -15202 -713  15204 0
 15200  15201 -15202 -713 -15205 0

c  2+1 --> break 
c    (-b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧  p_713) -> break
c  in CNF:
c     b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ -p_713 ∨ break
c  in DIMACS:
 15200 -15201  15202 -713 1162 0


c  2-1 --> 1
c    (-b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧ -p_713) -> (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0)
c  in CNF:
c     b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_2
c     b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_1
c     b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨  b^{31, 24}_0
c  in DIMACS:
 15200 -15201  15202  713 -15203 0
 15200 -15201  15202  713 -15204 0
 15200 -15201  15202  713  15205 0

c  1-1 --> 0
c    (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0 ∧ -p_713) -> (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧ -b^{31, 24}_0)
c  in CNF:
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_2
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_1
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_0
c  in DIMACS:
 15200  15201 -15202  713 -15203 0
 15200  15201 -15202  713 -15204 0
 15200  15201 -15202  713 -15205 0

c  0-1 --> -1
c    (-b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧ -p_713) -> ( b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0)
c  in CNF:
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨  b^{31, 24}_2
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_1
c     b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨  b^{31, 24}_0
c  in DIMACS:
 15200  15201  15202  713  15203 0
 15200  15201  15202  713 -15204 0
 15200  15201  15202  713  15205 0

c  -1-1 --> -2
c    ( b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧  b^{31, 23}_0 ∧ -p_713) -> ( b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0)
c  in CNF:
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨  b^{31, 24}_2
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨  b^{31, 24}_1
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨  p_713 ∨ -b^{31, 24}_0
c  in DIMACS:
-15200  15201 -15202  713  15203 0
-15200  15201 -15202  713  15204 0
-15200  15201 -15202  713 -15205 0

c  -2-1 --> break 
c    ( b^{31, 23}_2 ∧  b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧ -p_713) -> break
c  in CNF:
c    -b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨  b^{31, 23}_0 ∨  p_713 ∨ break
c  in DIMACS:
-15200 -15201  15202  713 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 23}_2 ∧ -b^{31, 23}_1 ∧ -b^{31, 23}_0 ∧ true) 
c  in CNF:
c    -b^{31, 23}_2 ∨  b^{31, 23}_1 ∨  b^{31, 23}_0 ∨ false 
c  in DIMACS:
-15200  15201  15202  0

c  3 does not represent an automaton state.
c    -(-b^{31, 23}_2 ∧  b^{31, 23}_1 ∧  b^{31, 23}_0 ∧ true) 
c  in CNF:
c     b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ false 
c  in DIMACS:
 15200 -15201 -15202  0
c  -3 does not represent an automaton state.
c    -( b^{31, 23}_2 ∧  b^{31, 23}_1 ∧  b^{31, 23}_0 ∧ true) 
c  in CNF:
c    -b^{31, 23}_2 ∨ -b^{31, 23}_1 ∨ -b^{31, 23}_0 ∨ false 
c  in DIMACS:
-15200 -15201 -15202  0

c i = 24
c  -2+1 --> -1
c    ( b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧  p_744) -> ( b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0)
c  in CNF:
c    -b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨  b^{31, 25}_2
c    -b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_1
c    -b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨  b^{31, 25}_0
c  in DIMACS:
-15203 -15204  15205 -744  15206 0
-15203 -15204  15205 -744 -15207 0
-15203 -15204  15205 -744  15208 0

c  -1+1 --> 0
c    ( b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0 ∧  p_744) -> (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧ -b^{31, 25}_0)
c  in CNF:
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_2
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_1
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_0
c  in DIMACS:
-15203  15204 -15205 -744 -15206 0
-15203  15204 -15205 -744 -15207 0
-15203  15204 -15205 -744 -15208 0

c  0+1 --> 1
c    (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧  p_744) -> (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0)
c  in CNF:
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_2
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_1
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨  b^{31, 25}_0
c  in DIMACS:
 15203  15204  15205 -744 -15206 0
 15203  15204  15205 -744 -15207 0
 15203  15204  15205 -744  15208 0

c  1+1 --> 2
c    (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0 ∧  p_744) -> (-b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0)
c  in CNF:
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_2
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨  b^{31, 25}_1
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ -p_744 ∨ -b^{31, 25}_0
c  in DIMACS:
 15203  15204 -15205 -744 -15206 0
 15203  15204 -15205 -744  15207 0
 15203  15204 -15205 -744 -15208 0

c  2+1 --> break 
c    (-b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧  p_744) -> break
c  in CNF:
c     b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 15203 -15204  15205 -744 1162 0


c  2-1 --> 1
c    (-b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧ -p_744) -> (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0)
c  in CNF:
c     b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_2
c     b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_1
c     b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨  b^{31, 25}_0
c  in DIMACS:
 15203 -15204  15205  744 -15206 0
 15203 -15204  15205  744 -15207 0
 15203 -15204  15205  744  15208 0

c  1-1 --> 0
c    (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0 ∧ -p_744) -> (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧ -b^{31, 25}_0)
c  in CNF:
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_2
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_1
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_0
c  in DIMACS:
 15203  15204 -15205  744 -15206 0
 15203  15204 -15205  744 -15207 0
 15203  15204 -15205  744 -15208 0

c  0-1 --> -1
c    (-b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧ -p_744) -> ( b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0)
c  in CNF:
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨  b^{31, 25}_2
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_1
c     b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨  b^{31, 25}_0
c  in DIMACS:
 15203  15204  15205  744  15206 0
 15203  15204  15205  744 -15207 0
 15203  15204  15205  744  15208 0

c  -1-1 --> -2
c    ( b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧  b^{31, 24}_0 ∧ -p_744) -> ( b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0)
c  in CNF:
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨  b^{31, 25}_2
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨  b^{31, 25}_1
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨  p_744 ∨ -b^{31, 25}_0
c  in DIMACS:
-15203  15204 -15205  744  15206 0
-15203  15204 -15205  744  15207 0
-15203  15204 -15205  744 -15208 0

c  -2-1 --> break 
c    ( b^{31, 24}_2 ∧  b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨  b^{31, 24}_0 ∨  p_744 ∨ break
c  in DIMACS:
-15203 -15204  15205  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 24}_2 ∧ -b^{31, 24}_1 ∧ -b^{31, 24}_0 ∧ true) 
c  in CNF:
c    -b^{31, 24}_2 ∨  b^{31, 24}_1 ∨  b^{31, 24}_0 ∨ false 
c  in DIMACS:
-15203  15204  15205  0

c  3 does not represent an automaton state.
c    -(-b^{31, 24}_2 ∧  b^{31, 24}_1 ∧  b^{31, 24}_0 ∧ true) 
c  in CNF:
c     b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ false 
c  in DIMACS:
 15203 -15204 -15205  0
c  -3 does not represent an automaton state.
c    -( b^{31, 24}_2 ∧  b^{31, 24}_1 ∧  b^{31, 24}_0 ∧ true) 
c  in CNF:
c    -b^{31, 24}_2 ∨ -b^{31, 24}_1 ∨ -b^{31, 24}_0 ∨ false 
c  in DIMACS:
-15203 -15204 -15205  0

c i = 25
c  -2+1 --> -1
c    ( b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧  p_775) -> ( b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0)
c  in CNF:
c    -b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨  b^{31, 26}_2
c    -b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_1
c    -b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨  b^{31, 26}_0
c  in DIMACS:
-15206 -15207  15208 -775  15209 0
-15206 -15207  15208 -775 -15210 0
-15206 -15207  15208 -775  15211 0

c  -1+1 --> 0
c    ( b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0 ∧  p_775) -> (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧ -b^{31, 26}_0)
c  in CNF:
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_2
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_1
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_0
c  in DIMACS:
-15206  15207 -15208 -775 -15209 0
-15206  15207 -15208 -775 -15210 0
-15206  15207 -15208 -775 -15211 0

c  0+1 --> 1
c    (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧  p_775) -> (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0)
c  in CNF:
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_2
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_1
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨  b^{31, 26}_0
c  in DIMACS:
 15206  15207  15208 -775 -15209 0
 15206  15207  15208 -775 -15210 0
 15206  15207  15208 -775  15211 0

c  1+1 --> 2
c    (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0 ∧  p_775) -> (-b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0)
c  in CNF:
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_2
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨  b^{31, 26}_1
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ -p_775 ∨ -b^{31, 26}_0
c  in DIMACS:
 15206  15207 -15208 -775 -15209 0
 15206  15207 -15208 -775  15210 0
 15206  15207 -15208 -775 -15211 0

c  2+1 --> break 
c    (-b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧  p_775) -> break
c  in CNF:
c     b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ -p_775 ∨ break
c  in DIMACS:
 15206 -15207  15208 -775 1162 0


c  2-1 --> 1
c    (-b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧ -p_775) -> (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0)
c  in CNF:
c     b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_2
c     b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_1
c     b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨  b^{31, 26}_0
c  in DIMACS:
 15206 -15207  15208  775 -15209 0
 15206 -15207  15208  775 -15210 0
 15206 -15207  15208  775  15211 0

c  1-1 --> 0
c    (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0 ∧ -p_775) -> (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧ -b^{31, 26}_0)
c  in CNF:
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_2
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_1
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_0
c  in DIMACS:
 15206  15207 -15208  775 -15209 0
 15206  15207 -15208  775 -15210 0
 15206  15207 -15208  775 -15211 0

c  0-1 --> -1
c    (-b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧ -p_775) -> ( b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0)
c  in CNF:
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨  b^{31, 26}_2
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_1
c     b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨  b^{31, 26}_0
c  in DIMACS:
 15206  15207  15208  775  15209 0
 15206  15207  15208  775 -15210 0
 15206  15207  15208  775  15211 0

c  -1-1 --> -2
c    ( b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧  b^{31, 25}_0 ∧ -p_775) -> ( b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0)
c  in CNF:
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨  b^{31, 26}_2
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨  b^{31, 26}_1
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨  p_775 ∨ -b^{31, 26}_0
c  in DIMACS:
-15206  15207 -15208  775  15209 0
-15206  15207 -15208  775  15210 0
-15206  15207 -15208  775 -15211 0

c  -2-1 --> break 
c    ( b^{31, 25}_2 ∧  b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧ -p_775) -> break
c  in CNF:
c    -b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨  b^{31, 25}_0 ∨  p_775 ∨ break
c  in DIMACS:
-15206 -15207  15208  775 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 25}_2 ∧ -b^{31, 25}_1 ∧ -b^{31, 25}_0 ∧ true) 
c  in CNF:
c    -b^{31, 25}_2 ∨  b^{31, 25}_1 ∨  b^{31, 25}_0 ∨ false 
c  in DIMACS:
-15206  15207  15208  0

c  3 does not represent an automaton state.
c    -(-b^{31, 25}_2 ∧  b^{31, 25}_1 ∧  b^{31, 25}_0 ∧ true) 
c  in CNF:
c     b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ false 
c  in DIMACS:
 15206 -15207 -15208  0
c  -3 does not represent an automaton state.
c    -( b^{31, 25}_2 ∧  b^{31, 25}_1 ∧  b^{31, 25}_0 ∧ true) 
c  in CNF:
c    -b^{31, 25}_2 ∨ -b^{31, 25}_1 ∨ -b^{31, 25}_0 ∨ false 
c  in DIMACS:
-15206 -15207 -15208  0

c i = 26
c  -2+1 --> -1
c    ( b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧  p_806) -> ( b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0)
c  in CNF:
c    -b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨  b^{31, 27}_2
c    -b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_1
c    -b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨  b^{31, 27}_0
c  in DIMACS:
-15209 -15210  15211 -806  15212 0
-15209 -15210  15211 -806 -15213 0
-15209 -15210  15211 -806  15214 0

c  -1+1 --> 0
c    ( b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0 ∧  p_806) -> (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧ -b^{31, 27}_0)
c  in CNF:
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_2
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_1
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_0
c  in DIMACS:
-15209  15210 -15211 -806 -15212 0
-15209  15210 -15211 -806 -15213 0
-15209  15210 -15211 -806 -15214 0

c  0+1 --> 1
c    (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧  p_806) -> (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0)
c  in CNF:
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_2
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_1
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨  b^{31, 27}_0
c  in DIMACS:
 15209  15210  15211 -806 -15212 0
 15209  15210  15211 -806 -15213 0
 15209  15210  15211 -806  15214 0

c  1+1 --> 2
c    (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0 ∧  p_806) -> (-b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0)
c  in CNF:
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_2
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨  b^{31, 27}_1
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ -p_806 ∨ -b^{31, 27}_0
c  in DIMACS:
 15209  15210 -15211 -806 -15212 0
 15209  15210 -15211 -806  15213 0
 15209  15210 -15211 -806 -15214 0

c  2+1 --> break 
c    (-b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧  p_806) -> break
c  in CNF:
c     b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 15209 -15210  15211 -806 1162 0


c  2-1 --> 1
c    (-b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧ -p_806) -> (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0)
c  in CNF:
c     b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_2
c     b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_1
c     b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨  b^{31, 27}_0
c  in DIMACS:
 15209 -15210  15211  806 -15212 0
 15209 -15210  15211  806 -15213 0
 15209 -15210  15211  806  15214 0

c  1-1 --> 0
c    (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0 ∧ -p_806) -> (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧ -b^{31, 27}_0)
c  in CNF:
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_2
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_1
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_0
c  in DIMACS:
 15209  15210 -15211  806 -15212 0
 15209  15210 -15211  806 -15213 0
 15209  15210 -15211  806 -15214 0

c  0-1 --> -1
c    (-b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧ -p_806) -> ( b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0)
c  in CNF:
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨  b^{31, 27}_2
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_1
c     b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨  b^{31, 27}_0
c  in DIMACS:
 15209  15210  15211  806  15212 0
 15209  15210  15211  806 -15213 0
 15209  15210  15211  806  15214 0

c  -1-1 --> -2
c    ( b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧  b^{31, 26}_0 ∧ -p_806) -> ( b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0)
c  in CNF:
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨  b^{31, 27}_2
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨  b^{31, 27}_1
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨  p_806 ∨ -b^{31, 27}_0
c  in DIMACS:
-15209  15210 -15211  806  15212 0
-15209  15210 -15211  806  15213 0
-15209  15210 -15211  806 -15214 0

c  -2-1 --> break 
c    ( b^{31, 26}_2 ∧  b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨  b^{31, 26}_0 ∨  p_806 ∨ break
c  in DIMACS:
-15209 -15210  15211  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 26}_2 ∧ -b^{31, 26}_1 ∧ -b^{31, 26}_0 ∧ true) 
c  in CNF:
c    -b^{31, 26}_2 ∨  b^{31, 26}_1 ∨  b^{31, 26}_0 ∨ false 
c  in DIMACS:
-15209  15210  15211  0

c  3 does not represent an automaton state.
c    -(-b^{31, 26}_2 ∧  b^{31, 26}_1 ∧  b^{31, 26}_0 ∧ true) 
c  in CNF:
c     b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ false 
c  in DIMACS:
 15209 -15210 -15211  0
c  -3 does not represent an automaton state.
c    -( b^{31, 26}_2 ∧  b^{31, 26}_1 ∧  b^{31, 26}_0 ∧ true) 
c  in CNF:
c    -b^{31, 26}_2 ∨ -b^{31, 26}_1 ∨ -b^{31, 26}_0 ∨ false 
c  in DIMACS:
-15209 -15210 -15211  0

c i = 27
c  -2+1 --> -1
c    ( b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧  p_837) -> ( b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0)
c  in CNF:
c    -b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨  b^{31, 28}_2
c    -b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_1
c    -b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨  b^{31, 28}_0
c  in DIMACS:
-15212 -15213  15214 -837  15215 0
-15212 -15213  15214 -837 -15216 0
-15212 -15213  15214 -837  15217 0

c  -1+1 --> 0
c    ( b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0 ∧  p_837) -> (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧ -b^{31, 28}_0)
c  in CNF:
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_2
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_1
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_0
c  in DIMACS:
-15212  15213 -15214 -837 -15215 0
-15212  15213 -15214 -837 -15216 0
-15212  15213 -15214 -837 -15217 0

c  0+1 --> 1
c    (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧  p_837) -> (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0)
c  in CNF:
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_2
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_1
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨  b^{31, 28}_0
c  in DIMACS:
 15212  15213  15214 -837 -15215 0
 15212  15213  15214 -837 -15216 0
 15212  15213  15214 -837  15217 0

c  1+1 --> 2
c    (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0 ∧  p_837) -> (-b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0)
c  in CNF:
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_2
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨  b^{31, 28}_1
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ -p_837 ∨ -b^{31, 28}_0
c  in DIMACS:
 15212  15213 -15214 -837 -15215 0
 15212  15213 -15214 -837  15216 0
 15212  15213 -15214 -837 -15217 0

c  2+1 --> break 
c    (-b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧  p_837) -> break
c  in CNF:
c     b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 15212 -15213  15214 -837 1162 0


c  2-1 --> 1
c    (-b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧ -p_837) -> (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0)
c  in CNF:
c     b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_2
c     b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_1
c     b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨  b^{31, 28}_0
c  in DIMACS:
 15212 -15213  15214  837 -15215 0
 15212 -15213  15214  837 -15216 0
 15212 -15213  15214  837  15217 0

c  1-1 --> 0
c    (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0 ∧ -p_837) -> (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧ -b^{31, 28}_0)
c  in CNF:
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_2
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_1
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_0
c  in DIMACS:
 15212  15213 -15214  837 -15215 0
 15212  15213 -15214  837 -15216 0
 15212  15213 -15214  837 -15217 0

c  0-1 --> -1
c    (-b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧ -p_837) -> ( b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0)
c  in CNF:
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨  b^{31, 28}_2
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_1
c     b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨  b^{31, 28}_0
c  in DIMACS:
 15212  15213  15214  837  15215 0
 15212  15213  15214  837 -15216 0
 15212  15213  15214  837  15217 0

c  -1-1 --> -2
c    ( b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧  b^{31, 27}_0 ∧ -p_837) -> ( b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0)
c  in CNF:
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨  b^{31, 28}_2
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨  b^{31, 28}_1
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨  p_837 ∨ -b^{31, 28}_0
c  in DIMACS:
-15212  15213 -15214  837  15215 0
-15212  15213 -15214  837  15216 0
-15212  15213 -15214  837 -15217 0

c  -2-1 --> break 
c    ( b^{31, 27}_2 ∧  b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨  b^{31, 27}_0 ∨  p_837 ∨ break
c  in DIMACS:
-15212 -15213  15214  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 27}_2 ∧ -b^{31, 27}_1 ∧ -b^{31, 27}_0 ∧ true) 
c  in CNF:
c    -b^{31, 27}_2 ∨  b^{31, 27}_1 ∨  b^{31, 27}_0 ∨ false 
c  in DIMACS:
-15212  15213  15214  0

c  3 does not represent an automaton state.
c    -(-b^{31, 27}_2 ∧  b^{31, 27}_1 ∧  b^{31, 27}_0 ∧ true) 
c  in CNF:
c     b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ false 
c  in DIMACS:
 15212 -15213 -15214  0
c  -3 does not represent an automaton state.
c    -( b^{31, 27}_2 ∧  b^{31, 27}_1 ∧  b^{31, 27}_0 ∧ true) 
c  in CNF:
c    -b^{31, 27}_2 ∨ -b^{31, 27}_1 ∨ -b^{31, 27}_0 ∨ false 
c  in DIMACS:
-15212 -15213 -15214  0

c i = 28
c  -2+1 --> -1
c    ( b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧  p_868) -> ( b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0)
c  in CNF:
c    -b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨  b^{31, 29}_2
c    -b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_1
c    -b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨  b^{31, 29}_0
c  in DIMACS:
-15215 -15216  15217 -868  15218 0
-15215 -15216  15217 -868 -15219 0
-15215 -15216  15217 -868  15220 0

c  -1+1 --> 0
c    ( b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0 ∧  p_868) -> (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧ -b^{31, 29}_0)
c  in CNF:
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_2
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_1
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_0
c  in DIMACS:
-15215  15216 -15217 -868 -15218 0
-15215  15216 -15217 -868 -15219 0
-15215  15216 -15217 -868 -15220 0

c  0+1 --> 1
c    (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧  p_868) -> (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0)
c  in CNF:
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_2
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_1
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨  b^{31, 29}_0
c  in DIMACS:
 15215  15216  15217 -868 -15218 0
 15215  15216  15217 -868 -15219 0
 15215  15216  15217 -868  15220 0

c  1+1 --> 2
c    (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0 ∧  p_868) -> (-b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0)
c  in CNF:
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_2
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨  b^{31, 29}_1
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ -p_868 ∨ -b^{31, 29}_0
c  in DIMACS:
 15215  15216 -15217 -868 -15218 0
 15215  15216 -15217 -868  15219 0
 15215  15216 -15217 -868 -15220 0

c  2+1 --> break 
c    (-b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧  p_868) -> break
c  in CNF:
c     b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 15215 -15216  15217 -868 1162 0


c  2-1 --> 1
c    (-b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧ -p_868) -> (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0)
c  in CNF:
c     b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_2
c     b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_1
c     b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨  b^{31, 29}_0
c  in DIMACS:
 15215 -15216  15217  868 -15218 0
 15215 -15216  15217  868 -15219 0
 15215 -15216  15217  868  15220 0

c  1-1 --> 0
c    (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0 ∧ -p_868) -> (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧ -b^{31, 29}_0)
c  in CNF:
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_2
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_1
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_0
c  in DIMACS:
 15215  15216 -15217  868 -15218 0
 15215  15216 -15217  868 -15219 0
 15215  15216 -15217  868 -15220 0

c  0-1 --> -1
c    (-b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧ -p_868) -> ( b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0)
c  in CNF:
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨  b^{31, 29}_2
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_1
c     b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨  b^{31, 29}_0
c  in DIMACS:
 15215  15216  15217  868  15218 0
 15215  15216  15217  868 -15219 0
 15215  15216  15217  868  15220 0

c  -1-1 --> -2
c    ( b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧  b^{31, 28}_0 ∧ -p_868) -> ( b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0)
c  in CNF:
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨  b^{31, 29}_2
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨  b^{31, 29}_1
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨  p_868 ∨ -b^{31, 29}_0
c  in DIMACS:
-15215  15216 -15217  868  15218 0
-15215  15216 -15217  868  15219 0
-15215  15216 -15217  868 -15220 0

c  -2-1 --> break 
c    ( b^{31, 28}_2 ∧  b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨  b^{31, 28}_0 ∨  p_868 ∨ break
c  in DIMACS:
-15215 -15216  15217  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 28}_2 ∧ -b^{31, 28}_1 ∧ -b^{31, 28}_0 ∧ true) 
c  in CNF:
c    -b^{31, 28}_2 ∨  b^{31, 28}_1 ∨  b^{31, 28}_0 ∨ false 
c  in DIMACS:
-15215  15216  15217  0

c  3 does not represent an automaton state.
c    -(-b^{31, 28}_2 ∧  b^{31, 28}_1 ∧  b^{31, 28}_0 ∧ true) 
c  in CNF:
c     b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ false 
c  in DIMACS:
 15215 -15216 -15217  0
c  -3 does not represent an automaton state.
c    -( b^{31, 28}_2 ∧  b^{31, 28}_1 ∧  b^{31, 28}_0 ∧ true) 
c  in CNF:
c    -b^{31, 28}_2 ∨ -b^{31, 28}_1 ∨ -b^{31, 28}_0 ∨ false 
c  in DIMACS:
-15215 -15216 -15217  0

c i = 29
c  -2+1 --> -1
c    ( b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧  p_899) -> ( b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0)
c  in CNF:
c    -b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨  b^{31, 30}_2
c    -b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_1
c    -b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨  b^{31, 30}_0
c  in DIMACS:
-15218 -15219  15220 -899  15221 0
-15218 -15219  15220 -899 -15222 0
-15218 -15219  15220 -899  15223 0

c  -1+1 --> 0
c    ( b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0 ∧  p_899) -> (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧ -b^{31, 30}_0)
c  in CNF:
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_2
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_1
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_0
c  in DIMACS:
-15218  15219 -15220 -899 -15221 0
-15218  15219 -15220 -899 -15222 0
-15218  15219 -15220 -899 -15223 0

c  0+1 --> 1
c    (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧  p_899) -> (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0)
c  in CNF:
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_2
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_1
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨  b^{31, 30}_0
c  in DIMACS:
 15218  15219  15220 -899 -15221 0
 15218  15219  15220 -899 -15222 0
 15218  15219  15220 -899  15223 0

c  1+1 --> 2
c    (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0 ∧  p_899) -> (-b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0)
c  in CNF:
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_2
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨  b^{31, 30}_1
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ -p_899 ∨ -b^{31, 30}_0
c  in DIMACS:
 15218  15219 -15220 -899 -15221 0
 15218  15219 -15220 -899  15222 0
 15218  15219 -15220 -899 -15223 0

c  2+1 --> break 
c    (-b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧  p_899) -> break
c  in CNF:
c     b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ -p_899 ∨ break
c  in DIMACS:
 15218 -15219  15220 -899 1162 0


c  2-1 --> 1
c    (-b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧ -p_899) -> (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0)
c  in CNF:
c     b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_2
c     b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_1
c     b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨  b^{31, 30}_0
c  in DIMACS:
 15218 -15219  15220  899 -15221 0
 15218 -15219  15220  899 -15222 0
 15218 -15219  15220  899  15223 0

c  1-1 --> 0
c    (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0 ∧ -p_899) -> (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧ -b^{31, 30}_0)
c  in CNF:
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_2
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_1
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_0
c  in DIMACS:
 15218  15219 -15220  899 -15221 0
 15218  15219 -15220  899 -15222 0
 15218  15219 -15220  899 -15223 0

c  0-1 --> -1
c    (-b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧ -p_899) -> ( b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0)
c  in CNF:
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨  b^{31, 30}_2
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_1
c     b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨  b^{31, 30}_0
c  in DIMACS:
 15218  15219  15220  899  15221 0
 15218  15219  15220  899 -15222 0
 15218  15219  15220  899  15223 0

c  -1-1 --> -2
c    ( b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧  b^{31, 29}_0 ∧ -p_899) -> ( b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0)
c  in CNF:
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨  b^{31, 30}_2
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨  b^{31, 30}_1
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨  p_899 ∨ -b^{31, 30}_0
c  in DIMACS:
-15218  15219 -15220  899  15221 0
-15218  15219 -15220  899  15222 0
-15218  15219 -15220  899 -15223 0

c  -2-1 --> break 
c    ( b^{31, 29}_2 ∧  b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧ -p_899) -> break
c  in CNF:
c    -b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨  b^{31, 29}_0 ∨  p_899 ∨ break
c  in DIMACS:
-15218 -15219  15220  899 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 29}_2 ∧ -b^{31, 29}_1 ∧ -b^{31, 29}_0 ∧ true) 
c  in CNF:
c    -b^{31, 29}_2 ∨  b^{31, 29}_1 ∨  b^{31, 29}_0 ∨ false 
c  in DIMACS:
-15218  15219  15220  0

c  3 does not represent an automaton state.
c    -(-b^{31, 29}_2 ∧  b^{31, 29}_1 ∧  b^{31, 29}_0 ∧ true) 
c  in CNF:
c     b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ false 
c  in DIMACS:
 15218 -15219 -15220  0
c  -3 does not represent an automaton state.
c    -( b^{31, 29}_2 ∧  b^{31, 29}_1 ∧  b^{31, 29}_0 ∧ true) 
c  in CNF:
c    -b^{31, 29}_2 ∨ -b^{31, 29}_1 ∨ -b^{31, 29}_0 ∨ false 
c  in DIMACS:
-15218 -15219 -15220  0

c i = 30
c  -2+1 --> -1
c    ( b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧  p_930) -> ( b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0)
c  in CNF:
c    -b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨  b^{31, 31}_2
c    -b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_1
c    -b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨  b^{31, 31}_0
c  in DIMACS:
-15221 -15222  15223 -930  15224 0
-15221 -15222  15223 -930 -15225 0
-15221 -15222  15223 -930  15226 0

c  -1+1 --> 0
c    ( b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0 ∧  p_930) -> (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧ -b^{31, 31}_0)
c  in CNF:
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_2
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_1
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_0
c  in DIMACS:
-15221  15222 -15223 -930 -15224 0
-15221  15222 -15223 -930 -15225 0
-15221  15222 -15223 -930 -15226 0

c  0+1 --> 1
c    (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧  p_930) -> (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0)
c  in CNF:
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_2
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_1
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨  b^{31, 31}_0
c  in DIMACS:
 15221  15222  15223 -930 -15224 0
 15221  15222  15223 -930 -15225 0
 15221  15222  15223 -930  15226 0

c  1+1 --> 2
c    (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0 ∧  p_930) -> (-b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0)
c  in CNF:
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_2
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨  b^{31, 31}_1
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ -p_930 ∨ -b^{31, 31}_0
c  in DIMACS:
 15221  15222 -15223 -930 -15224 0
 15221  15222 -15223 -930  15225 0
 15221  15222 -15223 -930 -15226 0

c  2+1 --> break 
c    (-b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧  p_930) -> break
c  in CNF:
c     b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 15221 -15222  15223 -930 1162 0


c  2-1 --> 1
c    (-b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧ -p_930) -> (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0)
c  in CNF:
c     b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_2
c     b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_1
c     b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨  b^{31, 31}_0
c  in DIMACS:
 15221 -15222  15223  930 -15224 0
 15221 -15222  15223  930 -15225 0
 15221 -15222  15223  930  15226 0

c  1-1 --> 0
c    (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0 ∧ -p_930) -> (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧ -b^{31, 31}_0)
c  in CNF:
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_2
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_1
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_0
c  in DIMACS:
 15221  15222 -15223  930 -15224 0
 15221  15222 -15223  930 -15225 0
 15221  15222 -15223  930 -15226 0

c  0-1 --> -1
c    (-b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧ -p_930) -> ( b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0)
c  in CNF:
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨  b^{31, 31}_2
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_1
c     b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨  b^{31, 31}_0
c  in DIMACS:
 15221  15222  15223  930  15224 0
 15221  15222  15223  930 -15225 0
 15221  15222  15223  930  15226 0

c  -1-1 --> -2
c    ( b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧  b^{31, 30}_0 ∧ -p_930) -> ( b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0)
c  in CNF:
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨  b^{31, 31}_2
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨  b^{31, 31}_1
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨  p_930 ∨ -b^{31, 31}_0
c  in DIMACS:
-15221  15222 -15223  930  15224 0
-15221  15222 -15223  930  15225 0
-15221  15222 -15223  930 -15226 0

c  -2-1 --> break 
c    ( b^{31, 30}_2 ∧  b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨  b^{31, 30}_0 ∨  p_930 ∨ break
c  in DIMACS:
-15221 -15222  15223  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 30}_2 ∧ -b^{31, 30}_1 ∧ -b^{31, 30}_0 ∧ true) 
c  in CNF:
c    -b^{31, 30}_2 ∨  b^{31, 30}_1 ∨  b^{31, 30}_0 ∨ false 
c  in DIMACS:
-15221  15222  15223  0

c  3 does not represent an automaton state.
c    -(-b^{31, 30}_2 ∧  b^{31, 30}_1 ∧  b^{31, 30}_0 ∧ true) 
c  in CNF:
c     b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ false 
c  in DIMACS:
 15221 -15222 -15223  0
c  -3 does not represent an automaton state.
c    -( b^{31, 30}_2 ∧  b^{31, 30}_1 ∧  b^{31, 30}_0 ∧ true) 
c  in CNF:
c    -b^{31, 30}_2 ∨ -b^{31, 30}_1 ∨ -b^{31, 30}_0 ∨ false 
c  in DIMACS:
-15221 -15222 -15223  0

c i = 31
c  -2+1 --> -1
c    ( b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧  p_961) -> ( b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0)
c  in CNF:
c    -b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨  b^{31, 32}_2
c    -b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_1
c    -b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨  b^{31, 32}_0
c  in DIMACS:
-15224 -15225  15226 -961  15227 0
-15224 -15225  15226 -961 -15228 0
-15224 -15225  15226 -961  15229 0

c  -1+1 --> 0
c    ( b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0 ∧  p_961) -> (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧ -b^{31, 32}_0)
c  in CNF:
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_2
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_1
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_0
c  in DIMACS:
-15224  15225 -15226 -961 -15227 0
-15224  15225 -15226 -961 -15228 0
-15224  15225 -15226 -961 -15229 0

c  0+1 --> 1
c    (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧  p_961) -> (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0)
c  in CNF:
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_2
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_1
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨  b^{31, 32}_0
c  in DIMACS:
 15224  15225  15226 -961 -15227 0
 15224  15225  15226 -961 -15228 0
 15224  15225  15226 -961  15229 0

c  1+1 --> 2
c    (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0 ∧  p_961) -> (-b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0)
c  in CNF:
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_2
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨  b^{31, 32}_1
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ -p_961 ∨ -b^{31, 32}_0
c  in DIMACS:
 15224  15225 -15226 -961 -15227 0
 15224  15225 -15226 -961  15228 0
 15224  15225 -15226 -961 -15229 0

c  2+1 --> break 
c    (-b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧  p_961) -> break
c  in CNF:
c     b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ -p_961 ∨ break
c  in DIMACS:
 15224 -15225  15226 -961 1162 0


c  2-1 --> 1
c    (-b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧ -p_961) -> (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0)
c  in CNF:
c     b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_2
c     b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_1
c     b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨  b^{31, 32}_0
c  in DIMACS:
 15224 -15225  15226  961 -15227 0
 15224 -15225  15226  961 -15228 0
 15224 -15225  15226  961  15229 0

c  1-1 --> 0
c    (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0 ∧ -p_961) -> (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧ -b^{31, 32}_0)
c  in CNF:
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_2
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_1
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_0
c  in DIMACS:
 15224  15225 -15226  961 -15227 0
 15224  15225 -15226  961 -15228 0
 15224  15225 -15226  961 -15229 0

c  0-1 --> -1
c    (-b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧ -p_961) -> ( b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0)
c  in CNF:
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨  b^{31, 32}_2
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_1
c     b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨  b^{31, 32}_0
c  in DIMACS:
 15224  15225  15226  961  15227 0
 15224  15225  15226  961 -15228 0
 15224  15225  15226  961  15229 0

c  -1-1 --> -2
c    ( b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧  b^{31, 31}_0 ∧ -p_961) -> ( b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0)
c  in CNF:
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨  b^{31, 32}_2
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨  b^{31, 32}_1
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨  p_961 ∨ -b^{31, 32}_0
c  in DIMACS:
-15224  15225 -15226  961  15227 0
-15224  15225 -15226  961  15228 0
-15224  15225 -15226  961 -15229 0

c  -2-1 --> break 
c    ( b^{31, 31}_2 ∧  b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧ -p_961) -> break
c  in CNF:
c    -b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨  b^{31, 31}_0 ∨  p_961 ∨ break
c  in DIMACS:
-15224 -15225  15226  961 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 31}_2 ∧ -b^{31, 31}_1 ∧ -b^{31, 31}_0 ∧ true) 
c  in CNF:
c    -b^{31, 31}_2 ∨  b^{31, 31}_1 ∨  b^{31, 31}_0 ∨ false 
c  in DIMACS:
-15224  15225  15226  0

c  3 does not represent an automaton state.
c    -(-b^{31, 31}_2 ∧  b^{31, 31}_1 ∧  b^{31, 31}_0 ∧ true) 
c  in CNF:
c     b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ false 
c  in DIMACS:
 15224 -15225 -15226  0
c  -3 does not represent an automaton state.
c    -( b^{31, 31}_2 ∧  b^{31, 31}_1 ∧  b^{31, 31}_0 ∧ true) 
c  in CNF:
c    -b^{31, 31}_2 ∨ -b^{31, 31}_1 ∨ -b^{31, 31}_0 ∨ false 
c  in DIMACS:
-15224 -15225 -15226  0

c i = 32
c  -2+1 --> -1
c    ( b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧  p_992) -> ( b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0)
c  in CNF:
c    -b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨  b^{31, 33}_2
c    -b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_1
c    -b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨  b^{31, 33}_0
c  in DIMACS:
-15227 -15228  15229 -992  15230 0
-15227 -15228  15229 -992 -15231 0
-15227 -15228  15229 -992  15232 0

c  -1+1 --> 0
c    ( b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0 ∧  p_992) -> (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧ -b^{31, 33}_0)
c  in CNF:
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_2
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_1
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_0
c  in DIMACS:
-15227  15228 -15229 -992 -15230 0
-15227  15228 -15229 -992 -15231 0
-15227  15228 -15229 -992 -15232 0

c  0+1 --> 1
c    (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧  p_992) -> (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0)
c  in CNF:
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_2
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_1
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨  b^{31, 33}_0
c  in DIMACS:
 15227  15228  15229 -992 -15230 0
 15227  15228  15229 -992 -15231 0
 15227  15228  15229 -992  15232 0

c  1+1 --> 2
c    (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0 ∧  p_992) -> (-b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0)
c  in CNF:
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_2
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨  b^{31, 33}_1
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ -p_992 ∨ -b^{31, 33}_0
c  in DIMACS:
 15227  15228 -15229 -992 -15230 0
 15227  15228 -15229 -992  15231 0
 15227  15228 -15229 -992 -15232 0

c  2+1 --> break 
c    (-b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧  p_992) -> break
c  in CNF:
c     b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 15227 -15228  15229 -992 1162 0


c  2-1 --> 1
c    (-b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧ -p_992) -> (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0)
c  in CNF:
c     b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_2
c     b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_1
c     b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨  b^{31, 33}_0
c  in DIMACS:
 15227 -15228  15229  992 -15230 0
 15227 -15228  15229  992 -15231 0
 15227 -15228  15229  992  15232 0

c  1-1 --> 0
c    (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0 ∧ -p_992) -> (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧ -b^{31, 33}_0)
c  in CNF:
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_2
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_1
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_0
c  in DIMACS:
 15227  15228 -15229  992 -15230 0
 15227  15228 -15229  992 -15231 0
 15227  15228 -15229  992 -15232 0

c  0-1 --> -1
c    (-b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧ -p_992) -> ( b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0)
c  in CNF:
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨  b^{31, 33}_2
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_1
c     b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨  b^{31, 33}_0
c  in DIMACS:
 15227  15228  15229  992  15230 0
 15227  15228  15229  992 -15231 0
 15227  15228  15229  992  15232 0

c  -1-1 --> -2
c    ( b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧  b^{31, 32}_0 ∧ -p_992) -> ( b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0)
c  in CNF:
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨  b^{31, 33}_2
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨  b^{31, 33}_1
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨  p_992 ∨ -b^{31, 33}_0
c  in DIMACS:
-15227  15228 -15229  992  15230 0
-15227  15228 -15229  992  15231 0
-15227  15228 -15229  992 -15232 0

c  -2-1 --> break 
c    ( b^{31, 32}_2 ∧  b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨  b^{31, 32}_0 ∨  p_992 ∨ break
c  in DIMACS:
-15227 -15228  15229  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 32}_2 ∧ -b^{31, 32}_1 ∧ -b^{31, 32}_0 ∧ true) 
c  in CNF:
c    -b^{31, 32}_2 ∨  b^{31, 32}_1 ∨  b^{31, 32}_0 ∨ false 
c  in DIMACS:
-15227  15228  15229  0

c  3 does not represent an automaton state.
c    -(-b^{31, 32}_2 ∧  b^{31, 32}_1 ∧  b^{31, 32}_0 ∧ true) 
c  in CNF:
c     b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ false 
c  in DIMACS:
 15227 -15228 -15229  0
c  -3 does not represent an automaton state.
c    -( b^{31, 32}_2 ∧  b^{31, 32}_1 ∧  b^{31, 32}_0 ∧ true) 
c  in CNF:
c    -b^{31, 32}_2 ∨ -b^{31, 32}_1 ∨ -b^{31, 32}_0 ∨ false 
c  in DIMACS:
-15227 -15228 -15229  0

c i = 33
c  -2+1 --> -1
c    ( b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧  p_1023) -> ( b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0)
c  in CNF:
c    -b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨  b^{31, 34}_2
c    -b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_1
c    -b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨  b^{31, 34}_0
c  in DIMACS:
-15230 -15231  15232 -1023  15233 0
-15230 -15231  15232 -1023 -15234 0
-15230 -15231  15232 -1023  15235 0

c  -1+1 --> 0
c    ( b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0 ∧  p_1023) -> (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧ -b^{31, 34}_0)
c  in CNF:
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_2
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_1
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_0
c  in DIMACS:
-15230  15231 -15232 -1023 -15233 0
-15230  15231 -15232 -1023 -15234 0
-15230  15231 -15232 -1023 -15235 0

c  0+1 --> 1
c    (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧  p_1023) -> (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0)
c  in CNF:
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_2
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_1
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨  b^{31, 34}_0
c  in DIMACS:
 15230  15231  15232 -1023 -15233 0
 15230  15231  15232 -1023 -15234 0
 15230  15231  15232 -1023  15235 0

c  1+1 --> 2
c    (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0 ∧  p_1023) -> (-b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0)
c  in CNF:
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_2
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨  b^{31, 34}_1
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ -p_1023 ∨ -b^{31, 34}_0
c  in DIMACS:
 15230  15231 -15232 -1023 -15233 0
 15230  15231 -15232 -1023  15234 0
 15230  15231 -15232 -1023 -15235 0

c  2+1 --> break 
c    (-b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 15230 -15231  15232 -1023 1162 0


c  2-1 --> 1
c    (-b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧ -p_1023) -> (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0)
c  in CNF:
c     b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_2
c     b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_1
c     b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨  b^{31, 34}_0
c  in DIMACS:
 15230 -15231  15232  1023 -15233 0
 15230 -15231  15232  1023 -15234 0
 15230 -15231  15232  1023  15235 0

c  1-1 --> 0
c    (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0 ∧ -p_1023) -> (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧ -b^{31, 34}_0)
c  in CNF:
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_2
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_1
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_0
c  in DIMACS:
 15230  15231 -15232  1023 -15233 0
 15230  15231 -15232  1023 -15234 0
 15230  15231 -15232  1023 -15235 0

c  0-1 --> -1
c    (-b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧ -p_1023) -> ( b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0)
c  in CNF:
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨  b^{31, 34}_2
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_1
c     b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨  b^{31, 34}_0
c  in DIMACS:
 15230  15231  15232  1023  15233 0
 15230  15231  15232  1023 -15234 0
 15230  15231  15232  1023  15235 0

c  -1-1 --> -2
c    ( b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧  b^{31, 33}_0 ∧ -p_1023) -> ( b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0)
c  in CNF:
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨  b^{31, 34}_2
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨  b^{31, 34}_1
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨  p_1023 ∨ -b^{31, 34}_0
c  in DIMACS:
-15230  15231 -15232  1023  15233 0
-15230  15231 -15232  1023  15234 0
-15230  15231 -15232  1023 -15235 0

c  -2-1 --> break 
c    ( b^{31, 33}_2 ∧  b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨  b^{31, 33}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-15230 -15231  15232  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 33}_2 ∧ -b^{31, 33}_1 ∧ -b^{31, 33}_0 ∧ true) 
c  in CNF:
c    -b^{31, 33}_2 ∨  b^{31, 33}_1 ∨  b^{31, 33}_0 ∨ false 
c  in DIMACS:
-15230  15231  15232  0

c  3 does not represent an automaton state.
c    -(-b^{31, 33}_2 ∧  b^{31, 33}_1 ∧  b^{31, 33}_0 ∧ true) 
c  in CNF:
c     b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ false 
c  in DIMACS:
 15230 -15231 -15232  0
c  -3 does not represent an automaton state.
c    -( b^{31, 33}_2 ∧  b^{31, 33}_1 ∧  b^{31, 33}_0 ∧ true) 
c  in CNF:
c    -b^{31, 33}_2 ∨ -b^{31, 33}_1 ∨ -b^{31, 33}_0 ∨ false 
c  in DIMACS:
-15230 -15231 -15232  0

c i = 34
c  -2+1 --> -1
c    ( b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧  p_1054) -> ( b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0)
c  in CNF:
c    -b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨  b^{31, 35}_2
c    -b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_1
c    -b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨  b^{31, 35}_0
c  in DIMACS:
-15233 -15234  15235 -1054  15236 0
-15233 -15234  15235 -1054 -15237 0
-15233 -15234  15235 -1054  15238 0

c  -1+1 --> 0
c    ( b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0 ∧  p_1054) -> (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧ -b^{31, 35}_0)
c  in CNF:
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_2
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_1
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_0
c  in DIMACS:
-15233  15234 -15235 -1054 -15236 0
-15233  15234 -15235 -1054 -15237 0
-15233  15234 -15235 -1054 -15238 0

c  0+1 --> 1
c    (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧  p_1054) -> (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0)
c  in CNF:
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_2
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_1
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨  b^{31, 35}_0
c  in DIMACS:
 15233  15234  15235 -1054 -15236 0
 15233  15234  15235 -1054 -15237 0
 15233  15234  15235 -1054  15238 0

c  1+1 --> 2
c    (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0 ∧  p_1054) -> (-b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0)
c  in CNF:
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_2
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨  b^{31, 35}_1
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ -p_1054 ∨ -b^{31, 35}_0
c  in DIMACS:
 15233  15234 -15235 -1054 -15236 0
 15233  15234 -15235 -1054  15237 0
 15233  15234 -15235 -1054 -15238 0

c  2+1 --> break 
c    (-b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 15233 -15234  15235 -1054 1162 0


c  2-1 --> 1
c    (-b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧ -p_1054) -> (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0)
c  in CNF:
c     b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_2
c     b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_1
c     b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨  b^{31, 35}_0
c  in DIMACS:
 15233 -15234  15235  1054 -15236 0
 15233 -15234  15235  1054 -15237 0
 15233 -15234  15235  1054  15238 0

c  1-1 --> 0
c    (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0 ∧ -p_1054) -> (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧ -b^{31, 35}_0)
c  in CNF:
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_2
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_1
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_0
c  in DIMACS:
 15233  15234 -15235  1054 -15236 0
 15233  15234 -15235  1054 -15237 0
 15233  15234 -15235  1054 -15238 0

c  0-1 --> -1
c    (-b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧ -p_1054) -> ( b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0)
c  in CNF:
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨  b^{31, 35}_2
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_1
c     b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨  b^{31, 35}_0
c  in DIMACS:
 15233  15234  15235  1054  15236 0
 15233  15234  15235  1054 -15237 0
 15233  15234  15235  1054  15238 0

c  -1-1 --> -2
c    ( b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧  b^{31, 34}_0 ∧ -p_1054) -> ( b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0)
c  in CNF:
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨  b^{31, 35}_2
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨  b^{31, 35}_1
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨  p_1054 ∨ -b^{31, 35}_0
c  in DIMACS:
-15233  15234 -15235  1054  15236 0
-15233  15234 -15235  1054  15237 0
-15233  15234 -15235  1054 -15238 0

c  -2-1 --> break 
c    ( b^{31, 34}_2 ∧  b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨  b^{31, 34}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-15233 -15234  15235  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 34}_2 ∧ -b^{31, 34}_1 ∧ -b^{31, 34}_0 ∧ true) 
c  in CNF:
c    -b^{31, 34}_2 ∨  b^{31, 34}_1 ∨  b^{31, 34}_0 ∨ false 
c  in DIMACS:
-15233  15234  15235  0

c  3 does not represent an automaton state.
c    -(-b^{31, 34}_2 ∧  b^{31, 34}_1 ∧  b^{31, 34}_0 ∧ true) 
c  in CNF:
c     b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ false 
c  in DIMACS:
 15233 -15234 -15235  0
c  -3 does not represent an automaton state.
c    -( b^{31, 34}_2 ∧  b^{31, 34}_1 ∧  b^{31, 34}_0 ∧ true) 
c  in CNF:
c    -b^{31, 34}_2 ∨ -b^{31, 34}_1 ∨ -b^{31, 34}_0 ∨ false 
c  in DIMACS:
-15233 -15234 -15235  0

c i = 35
c  -2+1 --> -1
c    ( b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧  p_1085) -> ( b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0)
c  in CNF:
c    -b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨  b^{31, 36}_2
c    -b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_1
c    -b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨  b^{31, 36}_0
c  in DIMACS:
-15236 -15237  15238 -1085  15239 0
-15236 -15237  15238 -1085 -15240 0
-15236 -15237  15238 -1085  15241 0

c  -1+1 --> 0
c    ( b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0 ∧  p_1085) -> (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧ -b^{31, 36}_0)
c  in CNF:
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_2
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_1
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_0
c  in DIMACS:
-15236  15237 -15238 -1085 -15239 0
-15236  15237 -15238 -1085 -15240 0
-15236  15237 -15238 -1085 -15241 0

c  0+1 --> 1
c    (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧  p_1085) -> (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0)
c  in CNF:
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_2
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_1
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨  b^{31, 36}_0
c  in DIMACS:
 15236  15237  15238 -1085 -15239 0
 15236  15237  15238 -1085 -15240 0
 15236  15237  15238 -1085  15241 0

c  1+1 --> 2
c    (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0 ∧  p_1085) -> (-b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0)
c  in CNF:
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_2
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨  b^{31, 36}_1
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ -p_1085 ∨ -b^{31, 36}_0
c  in DIMACS:
 15236  15237 -15238 -1085 -15239 0
 15236  15237 -15238 -1085  15240 0
 15236  15237 -15238 -1085 -15241 0

c  2+1 --> break 
c    (-b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 15236 -15237  15238 -1085 1162 0


c  2-1 --> 1
c    (-b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧ -p_1085) -> (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0)
c  in CNF:
c     b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_2
c     b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_1
c     b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨  b^{31, 36}_0
c  in DIMACS:
 15236 -15237  15238  1085 -15239 0
 15236 -15237  15238  1085 -15240 0
 15236 -15237  15238  1085  15241 0

c  1-1 --> 0
c    (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0 ∧ -p_1085) -> (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧ -b^{31, 36}_0)
c  in CNF:
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_2
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_1
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_0
c  in DIMACS:
 15236  15237 -15238  1085 -15239 0
 15236  15237 -15238  1085 -15240 0
 15236  15237 -15238  1085 -15241 0

c  0-1 --> -1
c    (-b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧ -p_1085) -> ( b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0)
c  in CNF:
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨  b^{31, 36}_2
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_1
c     b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨  b^{31, 36}_0
c  in DIMACS:
 15236  15237  15238  1085  15239 0
 15236  15237  15238  1085 -15240 0
 15236  15237  15238  1085  15241 0

c  -1-1 --> -2
c    ( b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧  b^{31, 35}_0 ∧ -p_1085) -> ( b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0)
c  in CNF:
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨  b^{31, 36}_2
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨  b^{31, 36}_1
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨  p_1085 ∨ -b^{31, 36}_0
c  in DIMACS:
-15236  15237 -15238  1085  15239 0
-15236  15237 -15238  1085  15240 0
-15236  15237 -15238  1085 -15241 0

c  -2-1 --> break 
c    ( b^{31, 35}_2 ∧  b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨  b^{31, 35}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-15236 -15237  15238  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 35}_2 ∧ -b^{31, 35}_1 ∧ -b^{31, 35}_0 ∧ true) 
c  in CNF:
c    -b^{31, 35}_2 ∨  b^{31, 35}_1 ∨  b^{31, 35}_0 ∨ false 
c  in DIMACS:
-15236  15237  15238  0

c  3 does not represent an automaton state.
c    -(-b^{31, 35}_2 ∧  b^{31, 35}_1 ∧  b^{31, 35}_0 ∧ true) 
c  in CNF:
c     b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ false 
c  in DIMACS:
 15236 -15237 -15238  0
c  -3 does not represent an automaton state.
c    -( b^{31, 35}_2 ∧  b^{31, 35}_1 ∧  b^{31, 35}_0 ∧ true) 
c  in CNF:
c    -b^{31, 35}_2 ∨ -b^{31, 35}_1 ∨ -b^{31, 35}_0 ∨ false 
c  in DIMACS:
-15236 -15237 -15238  0

c i = 36
c  -2+1 --> -1
c    ( b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧  p_1116) -> ( b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0)
c  in CNF:
c    -b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨  b^{31, 37}_2
c    -b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_1
c    -b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨  b^{31, 37}_0
c  in DIMACS:
-15239 -15240  15241 -1116  15242 0
-15239 -15240  15241 -1116 -15243 0
-15239 -15240  15241 -1116  15244 0

c  -1+1 --> 0
c    ( b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0 ∧  p_1116) -> (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧ -b^{31, 37}_0)
c  in CNF:
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_2
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_1
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_0
c  in DIMACS:
-15239  15240 -15241 -1116 -15242 0
-15239  15240 -15241 -1116 -15243 0
-15239  15240 -15241 -1116 -15244 0

c  0+1 --> 1
c    (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧  p_1116) -> (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0)
c  in CNF:
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_2
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_1
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨  b^{31, 37}_0
c  in DIMACS:
 15239  15240  15241 -1116 -15242 0
 15239  15240  15241 -1116 -15243 0
 15239  15240  15241 -1116  15244 0

c  1+1 --> 2
c    (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0 ∧  p_1116) -> (-b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0)
c  in CNF:
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_2
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨  b^{31, 37}_1
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ -p_1116 ∨ -b^{31, 37}_0
c  in DIMACS:
 15239  15240 -15241 -1116 -15242 0
 15239  15240 -15241 -1116  15243 0
 15239  15240 -15241 -1116 -15244 0

c  2+1 --> break 
c    (-b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 15239 -15240  15241 -1116 1162 0


c  2-1 --> 1
c    (-b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧ -p_1116) -> (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0)
c  in CNF:
c     b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_2
c     b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_1
c     b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨  b^{31, 37}_0
c  in DIMACS:
 15239 -15240  15241  1116 -15242 0
 15239 -15240  15241  1116 -15243 0
 15239 -15240  15241  1116  15244 0

c  1-1 --> 0
c    (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0 ∧ -p_1116) -> (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧ -b^{31, 37}_0)
c  in CNF:
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_2
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_1
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_0
c  in DIMACS:
 15239  15240 -15241  1116 -15242 0
 15239  15240 -15241  1116 -15243 0
 15239  15240 -15241  1116 -15244 0

c  0-1 --> -1
c    (-b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧ -p_1116) -> ( b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0)
c  in CNF:
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨  b^{31, 37}_2
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_1
c     b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨  b^{31, 37}_0
c  in DIMACS:
 15239  15240  15241  1116  15242 0
 15239  15240  15241  1116 -15243 0
 15239  15240  15241  1116  15244 0

c  -1-1 --> -2
c    ( b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧  b^{31, 36}_0 ∧ -p_1116) -> ( b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0)
c  in CNF:
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨  b^{31, 37}_2
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨  b^{31, 37}_1
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨  p_1116 ∨ -b^{31, 37}_0
c  in DIMACS:
-15239  15240 -15241  1116  15242 0
-15239  15240 -15241  1116  15243 0
-15239  15240 -15241  1116 -15244 0

c  -2-1 --> break 
c    ( b^{31, 36}_2 ∧  b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨  b^{31, 36}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-15239 -15240  15241  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 36}_2 ∧ -b^{31, 36}_1 ∧ -b^{31, 36}_0 ∧ true) 
c  in CNF:
c    -b^{31, 36}_2 ∨  b^{31, 36}_1 ∨  b^{31, 36}_0 ∨ false 
c  in DIMACS:
-15239  15240  15241  0

c  3 does not represent an automaton state.
c    -(-b^{31, 36}_2 ∧  b^{31, 36}_1 ∧  b^{31, 36}_0 ∧ true) 
c  in CNF:
c     b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ false 
c  in DIMACS:
 15239 -15240 -15241  0
c  -3 does not represent an automaton state.
c    -( b^{31, 36}_2 ∧  b^{31, 36}_1 ∧  b^{31, 36}_0 ∧ true) 
c  in CNF:
c    -b^{31, 36}_2 ∨ -b^{31, 36}_1 ∨ -b^{31, 36}_0 ∨ false 
c  in DIMACS:
-15239 -15240 -15241  0

c i = 37
c  -2+1 --> -1
c    ( b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧  p_1147) -> ( b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧  b^{31, 38}_0)
c  in CNF:
c    -b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨  b^{31, 38}_2
c    -b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_1
c    -b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨  b^{31, 38}_0
c  in DIMACS:
-15242 -15243  15244 -1147  15245 0
-15242 -15243  15244 -1147 -15246 0
-15242 -15243  15244 -1147  15247 0

c  -1+1 --> 0
c    ( b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0 ∧  p_1147) -> (-b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧ -b^{31, 38}_0)
c  in CNF:
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_2
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_1
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_0
c  in DIMACS:
-15242  15243 -15244 -1147 -15245 0
-15242  15243 -15244 -1147 -15246 0
-15242  15243 -15244 -1147 -15247 0

c  0+1 --> 1
c    (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧  p_1147) -> (-b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧  b^{31, 38}_0)
c  in CNF:
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_2
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_1
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨  b^{31, 38}_0
c  in DIMACS:
 15242  15243  15244 -1147 -15245 0
 15242  15243  15244 -1147 -15246 0
 15242  15243  15244 -1147  15247 0

c  1+1 --> 2
c    (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0 ∧  p_1147) -> (-b^{31, 38}_2 ∧  b^{31, 38}_1 ∧ -b^{31, 38}_0)
c  in CNF:
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_2
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨  b^{31, 38}_1
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ -p_1147 ∨ -b^{31, 38}_0
c  in DIMACS:
 15242  15243 -15244 -1147 -15245 0
 15242  15243 -15244 -1147  15246 0
 15242  15243 -15244 -1147 -15247 0

c  2+1 --> break 
c    (-b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧  p_1147) -> break
c  in CNF:
c     b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ -p_1147 ∨ break
c  in DIMACS:
 15242 -15243  15244 -1147 1162 0


c  2-1 --> 1
c    (-b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧ -p_1147) -> (-b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧  b^{31, 38}_0)
c  in CNF:
c     b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_2
c     b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_1
c     b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨  b^{31, 38}_0
c  in DIMACS:
 15242 -15243  15244  1147 -15245 0
 15242 -15243  15244  1147 -15246 0
 15242 -15243  15244  1147  15247 0

c  1-1 --> 0
c    (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0 ∧ -p_1147) -> (-b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧ -b^{31, 38}_0)
c  in CNF:
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_2
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_1
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_0
c  in DIMACS:
 15242  15243 -15244  1147 -15245 0
 15242  15243 -15244  1147 -15246 0
 15242  15243 -15244  1147 -15247 0

c  0-1 --> -1
c    (-b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧ -p_1147) -> ( b^{31, 38}_2 ∧ -b^{31, 38}_1 ∧  b^{31, 38}_0)
c  in CNF:
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨  b^{31, 38}_2
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_1
c     b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨  b^{31, 38}_0
c  in DIMACS:
 15242  15243  15244  1147  15245 0
 15242  15243  15244  1147 -15246 0
 15242  15243  15244  1147  15247 0

c  -1-1 --> -2
c    ( b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧  b^{31, 37}_0 ∧ -p_1147) -> ( b^{31, 38}_2 ∧  b^{31, 38}_1 ∧ -b^{31, 38}_0)
c  in CNF:
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨  b^{31, 38}_2
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨  b^{31, 38}_1
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨  p_1147 ∨ -b^{31, 38}_0
c  in DIMACS:
-15242  15243 -15244  1147  15245 0
-15242  15243 -15244  1147  15246 0
-15242  15243 -15244  1147 -15247 0

c  -2-1 --> break 
c    ( b^{31, 37}_2 ∧  b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧ -p_1147) -> break
c  in CNF:
c    -b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨  b^{31, 37}_0 ∨  p_1147 ∨ break
c  in DIMACS:
-15242 -15243  15244  1147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{31, 37}_2 ∧ -b^{31, 37}_1 ∧ -b^{31, 37}_0 ∧ true) 
c  in CNF:
c    -b^{31, 37}_2 ∨  b^{31, 37}_1 ∨  b^{31, 37}_0 ∨ false 
c  in DIMACS:
-15242  15243  15244  0

c  3 does not represent an automaton state.
c    -(-b^{31, 37}_2 ∧  b^{31, 37}_1 ∧  b^{31, 37}_0 ∧ true) 
c  in CNF:
c     b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ false 
c  in DIMACS:
 15242 -15243 -15244  0
c  -3 does not represent an automaton state.
c    -( b^{31, 37}_2 ∧  b^{31, 37}_1 ∧  b^{31, 37}_0 ∧ true) 
c  in CNF:
c    -b^{31, 37}_2 ∨ -b^{31, 37}_1 ∨ -b^{31, 37}_0 ∨ false 
c  in DIMACS:
-15242 -15243 -15244  0

c INIT for k = 32
c    -b^{32, 1}_2
c    -b^{32, 1}_1
c    -b^{32, 1}_0
c  in DIMACS:
-15248 0
-15249 0
-15250 0

c Transitions for k = 32
c i = 1
c  -2+1 --> -1
c    ( b^{32, 1}_2 ∧  b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧  p_32) -> ( b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0)
c  in CNF:
c    -b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨  b^{32, 2}_2
c    -b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_1
c    -b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨  b^{32, 2}_0
c  in DIMACS:
-15248 -15249  15250 -32  15251 0
-15248 -15249  15250 -32 -15252 0
-15248 -15249  15250 -32  15253 0

c  -1+1 --> 0
c    ( b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧  b^{32, 1}_0 ∧  p_32) -> (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧ -b^{32, 2}_0)
c  in CNF:
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_2
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_1
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_0
c  in DIMACS:
-15248  15249 -15250 -32 -15251 0
-15248  15249 -15250 -32 -15252 0
-15248  15249 -15250 -32 -15253 0

c  0+1 --> 1
c    (-b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧  p_32) -> (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0)
c  in CNF:
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_2
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_1
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨  b^{32, 2}_0
c  in DIMACS:
 15248  15249  15250 -32 -15251 0
 15248  15249  15250 -32 -15252 0
 15248  15249  15250 -32  15253 0

c  1+1 --> 2
c    (-b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧  b^{32, 1}_0 ∧  p_32) -> (-b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0)
c  in CNF:
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_2
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨  b^{32, 2}_1
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ -p_32 ∨ -b^{32, 2}_0
c  in DIMACS:
 15248  15249 -15250 -32 -15251 0
 15248  15249 -15250 -32  15252 0
 15248  15249 -15250 -32 -15253 0

c  2+1 --> break 
c    (-b^{32, 1}_2 ∧  b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧  p_32) -> break
c  in CNF:
c     b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ -p_32 ∨ break
c  in DIMACS:
 15248 -15249  15250 -32 1162 0


c  2-1 --> 1
c    (-b^{32, 1}_2 ∧  b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧ -p_32) -> (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0)
c  in CNF:
c     b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_2
c     b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_1
c     b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨  b^{32, 2}_0
c  in DIMACS:
 15248 -15249  15250  32 -15251 0
 15248 -15249  15250  32 -15252 0
 15248 -15249  15250  32  15253 0

c  1-1 --> 0
c    (-b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧  b^{32, 1}_0 ∧ -p_32) -> (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧ -b^{32, 2}_0)
c  in CNF:
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_2
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_1
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_0
c  in DIMACS:
 15248  15249 -15250  32 -15251 0
 15248  15249 -15250  32 -15252 0
 15248  15249 -15250  32 -15253 0

c  0-1 --> -1
c    (-b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧ -p_32) -> ( b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0)
c  in CNF:
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨  b^{32, 2}_2
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_1
c     b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨  b^{32, 2}_0
c  in DIMACS:
 15248  15249  15250  32  15251 0
 15248  15249  15250  32 -15252 0
 15248  15249  15250  32  15253 0

c  -1-1 --> -2
c    ( b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧  b^{32, 1}_0 ∧ -p_32) -> ( b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0)
c  in CNF:
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨  b^{32, 2}_2
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨  b^{32, 2}_1
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨  p_32 ∨ -b^{32, 2}_0
c  in DIMACS:
-15248  15249 -15250  32  15251 0
-15248  15249 -15250  32  15252 0
-15248  15249 -15250  32 -15253 0

c  -2-1 --> break 
c    ( b^{32, 1}_2 ∧  b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧ -p_32) -> break
c  in CNF:
c    -b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨  b^{32, 1}_0 ∨  p_32 ∨ break
c  in DIMACS:
-15248 -15249  15250  32 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 1}_2 ∧ -b^{32, 1}_1 ∧ -b^{32, 1}_0 ∧ true) 
c  in CNF:
c    -b^{32, 1}_2 ∨  b^{32, 1}_1 ∨  b^{32, 1}_0 ∨ false 
c  in DIMACS:
-15248  15249  15250  0

c  3 does not represent an automaton state.
c    -(-b^{32, 1}_2 ∧  b^{32, 1}_1 ∧  b^{32, 1}_0 ∧ true) 
c  in CNF:
c     b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ false 
c  in DIMACS:
 15248 -15249 -15250  0
c  -3 does not represent an automaton state.
c    -( b^{32, 1}_2 ∧  b^{32, 1}_1 ∧  b^{32, 1}_0 ∧ true) 
c  in CNF:
c    -b^{32, 1}_2 ∨ -b^{32, 1}_1 ∨ -b^{32, 1}_0 ∨ false 
c  in DIMACS:
-15248 -15249 -15250  0

c i = 2
c  -2+1 --> -1
c    ( b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧  p_64) -> ( b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0)
c  in CNF:
c    -b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨  b^{32, 3}_2
c    -b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_1
c    -b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨  b^{32, 3}_0
c  in DIMACS:
-15251 -15252  15253 -64  15254 0
-15251 -15252  15253 -64 -15255 0
-15251 -15252  15253 -64  15256 0

c  -1+1 --> 0
c    ( b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0 ∧  p_64) -> (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧ -b^{32, 3}_0)
c  in CNF:
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_2
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_1
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_0
c  in DIMACS:
-15251  15252 -15253 -64 -15254 0
-15251  15252 -15253 -64 -15255 0
-15251  15252 -15253 -64 -15256 0

c  0+1 --> 1
c    (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧  p_64) -> (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0)
c  in CNF:
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_2
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_1
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨  b^{32, 3}_0
c  in DIMACS:
 15251  15252  15253 -64 -15254 0
 15251  15252  15253 -64 -15255 0
 15251  15252  15253 -64  15256 0

c  1+1 --> 2
c    (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0 ∧  p_64) -> (-b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0)
c  in CNF:
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_2
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨  b^{32, 3}_1
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ -p_64 ∨ -b^{32, 3}_0
c  in DIMACS:
 15251  15252 -15253 -64 -15254 0
 15251  15252 -15253 -64  15255 0
 15251  15252 -15253 -64 -15256 0

c  2+1 --> break 
c    (-b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧  p_64) -> break
c  in CNF:
c     b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 15251 -15252  15253 -64 1162 0


c  2-1 --> 1
c    (-b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧ -p_64) -> (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0)
c  in CNF:
c     b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_2
c     b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_1
c     b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨  b^{32, 3}_0
c  in DIMACS:
 15251 -15252  15253  64 -15254 0
 15251 -15252  15253  64 -15255 0
 15251 -15252  15253  64  15256 0

c  1-1 --> 0
c    (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0 ∧ -p_64) -> (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧ -b^{32, 3}_0)
c  in CNF:
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_2
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_1
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_0
c  in DIMACS:
 15251  15252 -15253  64 -15254 0
 15251  15252 -15253  64 -15255 0
 15251  15252 -15253  64 -15256 0

c  0-1 --> -1
c    (-b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧ -p_64) -> ( b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0)
c  in CNF:
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨  b^{32, 3}_2
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_1
c     b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨  b^{32, 3}_0
c  in DIMACS:
 15251  15252  15253  64  15254 0
 15251  15252  15253  64 -15255 0
 15251  15252  15253  64  15256 0

c  -1-1 --> -2
c    ( b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧  b^{32, 2}_0 ∧ -p_64) -> ( b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0)
c  in CNF:
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨  b^{32, 3}_2
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨  b^{32, 3}_1
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨  p_64 ∨ -b^{32, 3}_0
c  in DIMACS:
-15251  15252 -15253  64  15254 0
-15251  15252 -15253  64  15255 0
-15251  15252 -15253  64 -15256 0

c  -2-1 --> break 
c    ( b^{32, 2}_2 ∧  b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨  b^{32, 2}_0 ∨  p_64 ∨ break
c  in DIMACS:
-15251 -15252  15253  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 2}_2 ∧ -b^{32, 2}_1 ∧ -b^{32, 2}_0 ∧ true) 
c  in CNF:
c    -b^{32, 2}_2 ∨  b^{32, 2}_1 ∨  b^{32, 2}_0 ∨ false 
c  in DIMACS:
-15251  15252  15253  0

c  3 does not represent an automaton state.
c    -(-b^{32, 2}_2 ∧  b^{32, 2}_1 ∧  b^{32, 2}_0 ∧ true) 
c  in CNF:
c     b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ false 
c  in DIMACS:
 15251 -15252 -15253  0
c  -3 does not represent an automaton state.
c    -( b^{32, 2}_2 ∧  b^{32, 2}_1 ∧  b^{32, 2}_0 ∧ true) 
c  in CNF:
c    -b^{32, 2}_2 ∨ -b^{32, 2}_1 ∨ -b^{32, 2}_0 ∨ false 
c  in DIMACS:
-15251 -15252 -15253  0

c i = 3
c  -2+1 --> -1
c    ( b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧  p_96) -> ( b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0)
c  in CNF:
c    -b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨  b^{32, 4}_2
c    -b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_1
c    -b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨  b^{32, 4}_0
c  in DIMACS:
-15254 -15255  15256 -96  15257 0
-15254 -15255  15256 -96 -15258 0
-15254 -15255  15256 -96  15259 0

c  -1+1 --> 0
c    ( b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0 ∧  p_96) -> (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧ -b^{32, 4}_0)
c  in CNF:
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_2
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_1
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_0
c  in DIMACS:
-15254  15255 -15256 -96 -15257 0
-15254  15255 -15256 -96 -15258 0
-15254  15255 -15256 -96 -15259 0

c  0+1 --> 1
c    (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧  p_96) -> (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0)
c  in CNF:
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_2
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_1
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨  b^{32, 4}_0
c  in DIMACS:
 15254  15255  15256 -96 -15257 0
 15254  15255  15256 -96 -15258 0
 15254  15255  15256 -96  15259 0

c  1+1 --> 2
c    (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0 ∧  p_96) -> (-b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0)
c  in CNF:
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_2
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨  b^{32, 4}_1
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ -p_96 ∨ -b^{32, 4}_0
c  in DIMACS:
 15254  15255 -15256 -96 -15257 0
 15254  15255 -15256 -96  15258 0
 15254  15255 -15256 -96 -15259 0

c  2+1 --> break 
c    (-b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧  p_96) -> break
c  in CNF:
c     b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 15254 -15255  15256 -96 1162 0


c  2-1 --> 1
c    (-b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧ -p_96) -> (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0)
c  in CNF:
c     b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_2
c     b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_1
c     b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨  b^{32, 4}_0
c  in DIMACS:
 15254 -15255  15256  96 -15257 0
 15254 -15255  15256  96 -15258 0
 15254 -15255  15256  96  15259 0

c  1-1 --> 0
c    (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0 ∧ -p_96) -> (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧ -b^{32, 4}_0)
c  in CNF:
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_2
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_1
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_0
c  in DIMACS:
 15254  15255 -15256  96 -15257 0
 15254  15255 -15256  96 -15258 0
 15254  15255 -15256  96 -15259 0

c  0-1 --> -1
c    (-b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧ -p_96) -> ( b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0)
c  in CNF:
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨  b^{32, 4}_2
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_1
c     b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨  b^{32, 4}_0
c  in DIMACS:
 15254  15255  15256  96  15257 0
 15254  15255  15256  96 -15258 0
 15254  15255  15256  96  15259 0

c  -1-1 --> -2
c    ( b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧  b^{32, 3}_0 ∧ -p_96) -> ( b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0)
c  in CNF:
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨  b^{32, 4}_2
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨  b^{32, 4}_1
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨  p_96 ∨ -b^{32, 4}_0
c  in DIMACS:
-15254  15255 -15256  96  15257 0
-15254  15255 -15256  96  15258 0
-15254  15255 -15256  96 -15259 0

c  -2-1 --> break 
c    ( b^{32, 3}_2 ∧  b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨  b^{32, 3}_0 ∨  p_96 ∨ break
c  in DIMACS:
-15254 -15255  15256  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 3}_2 ∧ -b^{32, 3}_1 ∧ -b^{32, 3}_0 ∧ true) 
c  in CNF:
c    -b^{32, 3}_2 ∨  b^{32, 3}_1 ∨  b^{32, 3}_0 ∨ false 
c  in DIMACS:
-15254  15255  15256  0

c  3 does not represent an automaton state.
c    -(-b^{32, 3}_2 ∧  b^{32, 3}_1 ∧  b^{32, 3}_0 ∧ true) 
c  in CNF:
c     b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ false 
c  in DIMACS:
 15254 -15255 -15256  0
c  -3 does not represent an automaton state.
c    -( b^{32, 3}_2 ∧  b^{32, 3}_1 ∧  b^{32, 3}_0 ∧ true) 
c  in CNF:
c    -b^{32, 3}_2 ∨ -b^{32, 3}_1 ∨ -b^{32, 3}_0 ∨ false 
c  in DIMACS:
-15254 -15255 -15256  0

c i = 4
c  -2+1 --> -1
c    ( b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧  p_128) -> ( b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0)
c  in CNF:
c    -b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨  b^{32, 5}_2
c    -b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_1
c    -b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨  b^{32, 5}_0
c  in DIMACS:
-15257 -15258  15259 -128  15260 0
-15257 -15258  15259 -128 -15261 0
-15257 -15258  15259 -128  15262 0

c  -1+1 --> 0
c    ( b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0 ∧  p_128) -> (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧ -b^{32, 5}_0)
c  in CNF:
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_2
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_1
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_0
c  in DIMACS:
-15257  15258 -15259 -128 -15260 0
-15257  15258 -15259 -128 -15261 0
-15257  15258 -15259 -128 -15262 0

c  0+1 --> 1
c    (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧  p_128) -> (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0)
c  in CNF:
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_2
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_1
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨  b^{32, 5}_0
c  in DIMACS:
 15257  15258  15259 -128 -15260 0
 15257  15258  15259 -128 -15261 0
 15257  15258  15259 -128  15262 0

c  1+1 --> 2
c    (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0 ∧  p_128) -> (-b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0)
c  in CNF:
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_2
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨  b^{32, 5}_1
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ -p_128 ∨ -b^{32, 5}_0
c  in DIMACS:
 15257  15258 -15259 -128 -15260 0
 15257  15258 -15259 -128  15261 0
 15257  15258 -15259 -128 -15262 0

c  2+1 --> break 
c    (-b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧  p_128) -> break
c  in CNF:
c     b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 15257 -15258  15259 -128 1162 0


c  2-1 --> 1
c    (-b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧ -p_128) -> (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0)
c  in CNF:
c     b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_2
c     b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_1
c     b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨  b^{32, 5}_0
c  in DIMACS:
 15257 -15258  15259  128 -15260 0
 15257 -15258  15259  128 -15261 0
 15257 -15258  15259  128  15262 0

c  1-1 --> 0
c    (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0 ∧ -p_128) -> (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧ -b^{32, 5}_0)
c  in CNF:
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_2
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_1
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_0
c  in DIMACS:
 15257  15258 -15259  128 -15260 0
 15257  15258 -15259  128 -15261 0
 15257  15258 -15259  128 -15262 0

c  0-1 --> -1
c    (-b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧ -p_128) -> ( b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0)
c  in CNF:
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨  b^{32, 5}_2
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_1
c     b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨  b^{32, 5}_0
c  in DIMACS:
 15257  15258  15259  128  15260 0
 15257  15258  15259  128 -15261 0
 15257  15258  15259  128  15262 0

c  -1-1 --> -2
c    ( b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧  b^{32, 4}_0 ∧ -p_128) -> ( b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0)
c  in CNF:
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨  b^{32, 5}_2
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨  b^{32, 5}_1
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨  p_128 ∨ -b^{32, 5}_0
c  in DIMACS:
-15257  15258 -15259  128  15260 0
-15257  15258 -15259  128  15261 0
-15257  15258 -15259  128 -15262 0

c  -2-1 --> break 
c    ( b^{32, 4}_2 ∧  b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨  b^{32, 4}_0 ∨  p_128 ∨ break
c  in DIMACS:
-15257 -15258  15259  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 4}_2 ∧ -b^{32, 4}_1 ∧ -b^{32, 4}_0 ∧ true) 
c  in CNF:
c    -b^{32, 4}_2 ∨  b^{32, 4}_1 ∨  b^{32, 4}_0 ∨ false 
c  in DIMACS:
-15257  15258  15259  0

c  3 does not represent an automaton state.
c    -(-b^{32, 4}_2 ∧  b^{32, 4}_1 ∧  b^{32, 4}_0 ∧ true) 
c  in CNF:
c     b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ false 
c  in DIMACS:
 15257 -15258 -15259  0
c  -3 does not represent an automaton state.
c    -( b^{32, 4}_2 ∧  b^{32, 4}_1 ∧  b^{32, 4}_0 ∧ true) 
c  in CNF:
c    -b^{32, 4}_2 ∨ -b^{32, 4}_1 ∨ -b^{32, 4}_0 ∨ false 
c  in DIMACS:
-15257 -15258 -15259  0

c i = 5
c  -2+1 --> -1
c    ( b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧  p_160) -> ( b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0)
c  in CNF:
c    -b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨  b^{32, 6}_2
c    -b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_1
c    -b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨  b^{32, 6}_0
c  in DIMACS:
-15260 -15261  15262 -160  15263 0
-15260 -15261  15262 -160 -15264 0
-15260 -15261  15262 -160  15265 0

c  -1+1 --> 0
c    ( b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0 ∧  p_160) -> (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧ -b^{32, 6}_0)
c  in CNF:
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_2
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_1
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_0
c  in DIMACS:
-15260  15261 -15262 -160 -15263 0
-15260  15261 -15262 -160 -15264 0
-15260  15261 -15262 -160 -15265 0

c  0+1 --> 1
c    (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧  p_160) -> (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0)
c  in CNF:
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_2
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_1
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨  b^{32, 6}_0
c  in DIMACS:
 15260  15261  15262 -160 -15263 0
 15260  15261  15262 -160 -15264 0
 15260  15261  15262 -160  15265 0

c  1+1 --> 2
c    (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0 ∧  p_160) -> (-b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0)
c  in CNF:
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_2
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨  b^{32, 6}_1
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ -p_160 ∨ -b^{32, 6}_0
c  in DIMACS:
 15260  15261 -15262 -160 -15263 0
 15260  15261 -15262 -160  15264 0
 15260  15261 -15262 -160 -15265 0

c  2+1 --> break 
c    (-b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧  p_160) -> break
c  in CNF:
c     b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 15260 -15261  15262 -160 1162 0


c  2-1 --> 1
c    (-b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧ -p_160) -> (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0)
c  in CNF:
c     b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_2
c     b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_1
c     b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨  b^{32, 6}_0
c  in DIMACS:
 15260 -15261  15262  160 -15263 0
 15260 -15261  15262  160 -15264 0
 15260 -15261  15262  160  15265 0

c  1-1 --> 0
c    (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0 ∧ -p_160) -> (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧ -b^{32, 6}_0)
c  in CNF:
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_2
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_1
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_0
c  in DIMACS:
 15260  15261 -15262  160 -15263 0
 15260  15261 -15262  160 -15264 0
 15260  15261 -15262  160 -15265 0

c  0-1 --> -1
c    (-b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧ -p_160) -> ( b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0)
c  in CNF:
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨  b^{32, 6}_2
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_1
c     b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨  b^{32, 6}_0
c  in DIMACS:
 15260  15261  15262  160  15263 0
 15260  15261  15262  160 -15264 0
 15260  15261  15262  160  15265 0

c  -1-1 --> -2
c    ( b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧  b^{32, 5}_0 ∧ -p_160) -> ( b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0)
c  in CNF:
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨  b^{32, 6}_2
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨  b^{32, 6}_1
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨  p_160 ∨ -b^{32, 6}_0
c  in DIMACS:
-15260  15261 -15262  160  15263 0
-15260  15261 -15262  160  15264 0
-15260  15261 -15262  160 -15265 0

c  -2-1 --> break 
c    ( b^{32, 5}_2 ∧  b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨  b^{32, 5}_0 ∨  p_160 ∨ break
c  in DIMACS:
-15260 -15261  15262  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 5}_2 ∧ -b^{32, 5}_1 ∧ -b^{32, 5}_0 ∧ true) 
c  in CNF:
c    -b^{32, 5}_2 ∨  b^{32, 5}_1 ∨  b^{32, 5}_0 ∨ false 
c  in DIMACS:
-15260  15261  15262  0

c  3 does not represent an automaton state.
c    -(-b^{32, 5}_2 ∧  b^{32, 5}_1 ∧  b^{32, 5}_0 ∧ true) 
c  in CNF:
c     b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ false 
c  in DIMACS:
 15260 -15261 -15262  0
c  -3 does not represent an automaton state.
c    -( b^{32, 5}_2 ∧  b^{32, 5}_1 ∧  b^{32, 5}_0 ∧ true) 
c  in CNF:
c    -b^{32, 5}_2 ∨ -b^{32, 5}_1 ∨ -b^{32, 5}_0 ∨ false 
c  in DIMACS:
-15260 -15261 -15262  0

c i = 6
c  -2+1 --> -1
c    ( b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧  p_192) -> ( b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0)
c  in CNF:
c    -b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨  b^{32, 7}_2
c    -b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_1
c    -b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨  b^{32, 7}_0
c  in DIMACS:
-15263 -15264  15265 -192  15266 0
-15263 -15264  15265 -192 -15267 0
-15263 -15264  15265 -192  15268 0

c  -1+1 --> 0
c    ( b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0 ∧  p_192) -> (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧ -b^{32, 7}_0)
c  in CNF:
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_2
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_1
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_0
c  in DIMACS:
-15263  15264 -15265 -192 -15266 0
-15263  15264 -15265 -192 -15267 0
-15263  15264 -15265 -192 -15268 0

c  0+1 --> 1
c    (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧  p_192) -> (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0)
c  in CNF:
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_2
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_1
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨  b^{32, 7}_0
c  in DIMACS:
 15263  15264  15265 -192 -15266 0
 15263  15264  15265 -192 -15267 0
 15263  15264  15265 -192  15268 0

c  1+1 --> 2
c    (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0 ∧  p_192) -> (-b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0)
c  in CNF:
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_2
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨  b^{32, 7}_1
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ -p_192 ∨ -b^{32, 7}_0
c  in DIMACS:
 15263  15264 -15265 -192 -15266 0
 15263  15264 -15265 -192  15267 0
 15263  15264 -15265 -192 -15268 0

c  2+1 --> break 
c    (-b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧  p_192) -> break
c  in CNF:
c     b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 15263 -15264  15265 -192 1162 0


c  2-1 --> 1
c    (-b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧ -p_192) -> (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0)
c  in CNF:
c     b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_2
c     b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_1
c     b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨  b^{32, 7}_0
c  in DIMACS:
 15263 -15264  15265  192 -15266 0
 15263 -15264  15265  192 -15267 0
 15263 -15264  15265  192  15268 0

c  1-1 --> 0
c    (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0 ∧ -p_192) -> (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧ -b^{32, 7}_0)
c  in CNF:
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_2
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_1
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_0
c  in DIMACS:
 15263  15264 -15265  192 -15266 0
 15263  15264 -15265  192 -15267 0
 15263  15264 -15265  192 -15268 0

c  0-1 --> -1
c    (-b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧ -p_192) -> ( b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0)
c  in CNF:
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨  b^{32, 7}_2
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_1
c     b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨  b^{32, 7}_0
c  in DIMACS:
 15263  15264  15265  192  15266 0
 15263  15264  15265  192 -15267 0
 15263  15264  15265  192  15268 0

c  -1-1 --> -2
c    ( b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧  b^{32, 6}_0 ∧ -p_192) -> ( b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0)
c  in CNF:
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨  b^{32, 7}_2
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨  b^{32, 7}_1
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨  p_192 ∨ -b^{32, 7}_0
c  in DIMACS:
-15263  15264 -15265  192  15266 0
-15263  15264 -15265  192  15267 0
-15263  15264 -15265  192 -15268 0

c  -2-1 --> break 
c    ( b^{32, 6}_2 ∧  b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨  b^{32, 6}_0 ∨  p_192 ∨ break
c  in DIMACS:
-15263 -15264  15265  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 6}_2 ∧ -b^{32, 6}_1 ∧ -b^{32, 6}_0 ∧ true) 
c  in CNF:
c    -b^{32, 6}_2 ∨  b^{32, 6}_1 ∨  b^{32, 6}_0 ∨ false 
c  in DIMACS:
-15263  15264  15265  0

c  3 does not represent an automaton state.
c    -(-b^{32, 6}_2 ∧  b^{32, 6}_1 ∧  b^{32, 6}_0 ∧ true) 
c  in CNF:
c     b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ false 
c  in DIMACS:
 15263 -15264 -15265  0
c  -3 does not represent an automaton state.
c    -( b^{32, 6}_2 ∧  b^{32, 6}_1 ∧  b^{32, 6}_0 ∧ true) 
c  in CNF:
c    -b^{32, 6}_2 ∨ -b^{32, 6}_1 ∨ -b^{32, 6}_0 ∨ false 
c  in DIMACS:
-15263 -15264 -15265  0

c i = 7
c  -2+1 --> -1
c    ( b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧  p_224) -> ( b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0)
c  in CNF:
c    -b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨  b^{32, 8}_2
c    -b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_1
c    -b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨  b^{32, 8}_0
c  in DIMACS:
-15266 -15267  15268 -224  15269 0
-15266 -15267  15268 -224 -15270 0
-15266 -15267  15268 -224  15271 0

c  -1+1 --> 0
c    ( b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0 ∧  p_224) -> (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧ -b^{32, 8}_0)
c  in CNF:
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_2
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_1
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_0
c  in DIMACS:
-15266  15267 -15268 -224 -15269 0
-15266  15267 -15268 -224 -15270 0
-15266  15267 -15268 -224 -15271 0

c  0+1 --> 1
c    (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧  p_224) -> (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0)
c  in CNF:
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_2
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_1
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨  b^{32, 8}_0
c  in DIMACS:
 15266  15267  15268 -224 -15269 0
 15266  15267  15268 -224 -15270 0
 15266  15267  15268 -224  15271 0

c  1+1 --> 2
c    (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0 ∧  p_224) -> (-b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0)
c  in CNF:
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_2
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨  b^{32, 8}_1
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ -p_224 ∨ -b^{32, 8}_0
c  in DIMACS:
 15266  15267 -15268 -224 -15269 0
 15266  15267 -15268 -224  15270 0
 15266  15267 -15268 -224 -15271 0

c  2+1 --> break 
c    (-b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧  p_224) -> break
c  in CNF:
c     b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 15266 -15267  15268 -224 1162 0


c  2-1 --> 1
c    (-b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧ -p_224) -> (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0)
c  in CNF:
c     b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_2
c     b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_1
c     b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨  b^{32, 8}_0
c  in DIMACS:
 15266 -15267  15268  224 -15269 0
 15266 -15267  15268  224 -15270 0
 15266 -15267  15268  224  15271 0

c  1-1 --> 0
c    (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0 ∧ -p_224) -> (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧ -b^{32, 8}_0)
c  in CNF:
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_2
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_1
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_0
c  in DIMACS:
 15266  15267 -15268  224 -15269 0
 15266  15267 -15268  224 -15270 0
 15266  15267 -15268  224 -15271 0

c  0-1 --> -1
c    (-b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧ -p_224) -> ( b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0)
c  in CNF:
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨  b^{32, 8}_2
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_1
c     b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨  b^{32, 8}_0
c  in DIMACS:
 15266  15267  15268  224  15269 0
 15266  15267  15268  224 -15270 0
 15266  15267  15268  224  15271 0

c  -1-1 --> -2
c    ( b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧  b^{32, 7}_0 ∧ -p_224) -> ( b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0)
c  in CNF:
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨  b^{32, 8}_2
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨  b^{32, 8}_1
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨  p_224 ∨ -b^{32, 8}_0
c  in DIMACS:
-15266  15267 -15268  224  15269 0
-15266  15267 -15268  224  15270 0
-15266  15267 -15268  224 -15271 0

c  -2-1 --> break 
c    ( b^{32, 7}_2 ∧  b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨  b^{32, 7}_0 ∨  p_224 ∨ break
c  in DIMACS:
-15266 -15267  15268  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 7}_2 ∧ -b^{32, 7}_1 ∧ -b^{32, 7}_0 ∧ true) 
c  in CNF:
c    -b^{32, 7}_2 ∨  b^{32, 7}_1 ∨  b^{32, 7}_0 ∨ false 
c  in DIMACS:
-15266  15267  15268  0

c  3 does not represent an automaton state.
c    -(-b^{32, 7}_2 ∧  b^{32, 7}_1 ∧  b^{32, 7}_0 ∧ true) 
c  in CNF:
c     b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ false 
c  in DIMACS:
 15266 -15267 -15268  0
c  -3 does not represent an automaton state.
c    -( b^{32, 7}_2 ∧  b^{32, 7}_1 ∧  b^{32, 7}_0 ∧ true) 
c  in CNF:
c    -b^{32, 7}_2 ∨ -b^{32, 7}_1 ∨ -b^{32, 7}_0 ∨ false 
c  in DIMACS:
-15266 -15267 -15268  0

c i = 8
c  -2+1 --> -1
c    ( b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧  p_256) -> ( b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0)
c  in CNF:
c    -b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨  b^{32, 9}_2
c    -b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_1
c    -b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨  b^{32, 9}_0
c  in DIMACS:
-15269 -15270  15271 -256  15272 0
-15269 -15270  15271 -256 -15273 0
-15269 -15270  15271 -256  15274 0

c  -1+1 --> 0
c    ( b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0 ∧  p_256) -> (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧ -b^{32, 9}_0)
c  in CNF:
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_2
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_1
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_0
c  in DIMACS:
-15269  15270 -15271 -256 -15272 0
-15269  15270 -15271 -256 -15273 0
-15269  15270 -15271 -256 -15274 0

c  0+1 --> 1
c    (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧  p_256) -> (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0)
c  in CNF:
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_2
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_1
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨  b^{32, 9}_0
c  in DIMACS:
 15269  15270  15271 -256 -15272 0
 15269  15270  15271 -256 -15273 0
 15269  15270  15271 -256  15274 0

c  1+1 --> 2
c    (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0 ∧  p_256) -> (-b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0)
c  in CNF:
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_2
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨  b^{32, 9}_1
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ -p_256 ∨ -b^{32, 9}_0
c  in DIMACS:
 15269  15270 -15271 -256 -15272 0
 15269  15270 -15271 -256  15273 0
 15269  15270 -15271 -256 -15274 0

c  2+1 --> break 
c    (-b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧  p_256) -> break
c  in CNF:
c     b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 15269 -15270  15271 -256 1162 0


c  2-1 --> 1
c    (-b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧ -p_256) -> (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0)
c  in CNF:
c     b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_2
c     b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_1
c     b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨  b^{32, 9}_0
c  in DIMACS:
 15269 -15270  15271  256 -15272 0
 15269 -15270  15271  256 -15273 0
 15269 -15270  15271  256  15274 0

c  1-1 --> 0
c    (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0 ∧ -p_256) -> (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧ -b^{32, 9}_0)
c  in CNF:
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_2
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_1
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_0
c  in DIMACS:
 15269  15270 -15271  256 -15272 0
 15269  15270 -15271  256 -15273 0
 15269  15270 -15271  256 -15274 0

c  0-1 --> -1
c    (-b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧ -p_256) -> ( b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0)
c  in CNF:
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨  b^{32, 9}_2
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_1
c     b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨  b^{32, 9}_0
c  in DIMACS:
 15269  15270  15271  256  15272 0
 15269  15270  15271  256 -15273 0
 15269  15270  15271  256  15274 0

c  -1-1 --> -2
c    ( b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧  b^{32, 8}_0 ∧ -p_256) -> ( b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0)
c  in CNF:
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨  b^{32, 9}_2
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨  b^{32, 9}_1
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨  p_256 ∨ -b^{32, 9}_0
c  in DIMACS:
-15269  15270 -15271  256  15272 0
-15269  15270 -15271  256  15273 0
-15269  15270 -15271  256 -15274 0

c  -2-1 --> break 
c    ( b^{32, 8}_2 ∧  b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨  b^{32, 8}_0 ∨  p_256 ∨ break
c  in DIMACS:
-15269 -15270  15271  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 8}_2 ∧ -b^{32, 8}_1 ∧ -b^{32, 8}_0 ∧ true) 
c  in CNF:
c    -b^{32, 8}_2 ∨  b^{32, 8}_1 ∨  b^{32, 8}_0 ∨ false 
c  in DIMACS:
-15269  15270  15271  0

c  3 does not represent an automaton state.
c    -(-b^{32, 8}_2 ∧  b^{32, 8}_1 ∧  b^{32, 8}_0 ∧ true) 
c  in CNF:
c     b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ false 
c  in DIMACS:
 15269 -15270 -15271  0
c  -3 does not represent an automaton state.
c    -( b^{32, 8}_2 ∧  b^{32, 8}_1 ∧  b^{32, 8}_0 ∧ true) 
c  in CNF:
c    -b^{32, 8}_2 ∨ -b^{32, 8}_1 ∨ -b^{32, 8}_0 ∨ false 
c  in DIMACS:
-15269 -15270 -15271  0

c i = 9
c  -2+1 --> -1
c    ( b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧  p_288) -> ( b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0)
c  in CNF:
c    -b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨  b^{32, 10}_2
c    -b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_1
c    -b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨  b^{32, 10}_0
c  in DIMACS:
-15272 -15273  15274 -288  15275 0
-15272 -15273  15274 -288 -15276 0
-15272 -15273  15274 -288  15277 0

c  -1+1 --> 0
c    ( b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0 ∧  p_288) -> (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧ -b^{32, 10}_0)
c  in CNF:
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_2
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_1
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_0
c  in DIMACS:
-15272  15273 -15274 -288 -15275 0
-15272  15273 -15274 -288 -15276 0
-15272  15273 -15274 -288 -15277 0

c  0+1 --> 1
c    (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧  p_288) -> (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0)
c  in CNF:
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_2
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_1
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨  b^{32, 10}_0
c  in DIMACS:
 15272  15273  15274 -288 -15275 0
 15272  15273  15274 -288 -15276 0
 15272  15273  15274 -288  15277 0

c  1+1 --> 2
c    (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0 ∧  p_288) -> (-b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0)
c  in CNF:
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_2
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨  b^{32, 10}_1
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ -p_288 ∨ -b^{32, 10}_0
c  in DIMACS:
 15272  15273 -15274 -288 -15275 0
 15272  15273 -15274 -288  15276 0
 15272  15273 -15274 -288 -15277 0

c  2+1 --> break 
c    (-b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧  p_288) -> break
c  in CNF:
c     b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 15272 -15273  15274 -288 1162 0


c  2-1 --> 1
c    (-b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧ -p_288) -> (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0)
c  in CNF:
c     b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_2
c     b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_1
c     b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨  b^{32, 10}_0
c  in DIMACS:
 15272 -15273  15274  288 -15275 0
 15272 -15273  15274  288 -15276 0
 15272 -15273  15274  288  15277 0

c  1-1 --> 0
c    (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0 ∧ -p_288) -> (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧ -b^{32, 10}_0)
c  in CNF:
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_2
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_1
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_0
c  in DIMACS:
 15272  15273 -15274  288 -15275 0
 15272  15273 -15274  288 -15276 0
 15272  15273 -15274  288 -15277 0

c  0-1 --> -1
c    (-b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧ -p_288) -> ( b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0)
c  in CNF:
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨  b^{32, 10}_2
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_1
c     b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨  b^{32, 10}_0
c  in DIMACS:
 15272  15273  15274  288  15275 0
 15272  15273  15274  288 -15276 0
 15272  15273  15274  288  15277 0

c  -1-1 --> -2
c    ( b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧  b^{32, 9}_0 ∧ -p_288) -> ( b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0)
c  in CNF:
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨  b^{32, 10}_2
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨  b^{32, 10}_1
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨  p_288 ∨ -b^{32, 10}_0
c  in DIMACS:
-15272  15273 -15274  288  15275 0
-15272  15273 -15274  288  15276 0
-15272  15273 -15274  288 -15277 0

c  -2-1 --> break 
c    ( b^{32, 9}_2 ∧  b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨  b^{32, 9}_0 ∨  p_288 ∨ break
c  in DIMACS:
-15272 -15273  15274  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 9}_2 ∧ -b^{32, 9}_1 ∧ -b^{32, 9}_0 ∧ true) 
c  in CNF:
c    -b^{32, 9}_2 ∨  b^{32, 9}_1 ∨  b^{32, 9}_0 ∨ false 
c  in DIMACS:
-15272  15273  15274  0

c  3 does not represent an automaton state.
c    -(-b^{32, 9}_2 ∧  b^{32, 9}_1 ∧  b^{32, 9}_0 ∧ true) 
c  in CNF:
c     b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ false 
c  in DIMACS:
 15272 -15273 -15274  0
c  -3 does not represent an automaton state.
c    -( b^{32, 9}_2 ∧  b^{32, 9}_1 ∧  b^{32, 9}_0 ∧ true) 
c  in CNF:
c    -b^{32, 9}_2 ∨ -b^{32, 9}_1 ∨ -b^{32, 9}_0 ∨ false 
c  in DIMACS:
-15272 -15273 -15274  0

c i = 10
c  -2+1 --> -1
c    ( b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧  p_320) -> ( b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0)
c  in CNF:
c    -b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨  b^{32, 11}_2
c    -b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_1
c    -b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨  b^{32, 11}_0
c  in DIMACS:
-15275 -15276  15277 -320  15278 0
-15275 -15276  15277 -320 -15279 0
-15275 -15276  15277 -320  15280 0

c  -1+1 --> 0
c    ( b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0 ∧  p_320) -> (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧ -b^{32, 11}_0)
c  in CNF:
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_2
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_1
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_0
c  in DIMACS:
-15275  15276 -15277 -320 -15278 0
-15275  15276 -15277 -320 -15279 0
-15275  15276 -15277 -320 -15280 0

c  0+1 --> 1
c    (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧  p_320) -> (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0)
c  in CNF:
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_2
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_1
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨  b^{32, 11}_0
c  in DIMACS:
 15275  15276  15277 -320 -15278 0
 15275  15276  15277 -320 -15279 0
 15275  15276  15277 -320  15280 0

c  1+1 --> 2
c    (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0 ∧  p_320) -> (-b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0)
c  in CNF:
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_2
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨  b^{32, 11}_1
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ -p_320 ∨ -b^{32, 11}_0
c  in DIMACS:
 15275  15276 -15277 -320 -15278 0
 15275  15276 -15277 -320  15279 0
 15275  15276 -15277 -320 -15280 0

c  2+1 --> break 
c    (-b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧  p_320) -> break
c  in CNF:
c     b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 15275 -15276  15277 -320 1162 0


c  2-1 --> 1
c    (-b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧ -p_320) -> (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0)
c  in CNF:
c     b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_2
c     b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_1
c     b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨  b^{32, 11}_0
c  in DIMACS:
 15275 -15276  15277  320 -15278 0
 15275 -15276  15277  320 -15279 0
 15275 -15276  15277  320  15280 0

c  1-1 --> 0
c    (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0 ∧ -p_320) -> (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧ -b^{32, 11}_0)
c  in CNF:
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_2
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_1
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_0
c  in DIMACS:
 15275  15276 -15277  320 -15278 0
 15275  15276 -15277  320 -15279 0
 15275  15276 -15277  320 -15280 0

c  0-1 --> -1
c    (-b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧ -p_320) -> ( b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0)
c  in CNF:
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨  b^{32, 11}_2
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_1
c     b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨  b^{32, 11}_0
c  in DIMACS:
 15275  15276  15277  320  15278 0
 15275  15276  15277  320 -15279 0
 15275  15276  15277  320  15280 0

c  -1-1 --> -2
c    ( b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧  b^{32, 10}_0 ∧ -p_320) -> ( b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0)
c  in CNF:
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨  b^{32, 11}_2
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨  b^{32, 11}_1
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨  p_320 ∨ -b^{32, 11}_0
c  in DIMACS:
-15275  15276 -15277  320  15278 0
-15275  15276 -15277  320  15279 0
-15275  15276 -15277  320 -15280 0

c  -2-1 --> break 
c    ( b^{32, 10}_2 ∧  b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨  b^{32, 10}_0 ∨  p_320 ∨ break
c  in DIMACS:
-15275 -15276  15277  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 10}_2 ∧ -b^{32, 10}_1 ∧ -b^{32, 10}_0 ∧ true) 
c  in CNF:
c    -b^{32, 10}_2 ∨  b^{32, 10}_1 ∨  b^{32, 10}_0 ∨ false 
c  in DIMACS:
-15275  15276  15277  0

c  3 does not represent an automaton state.
c    -(-b^{32, 10}_2 ∧  b^{32, 10}_1 ∧  b^{32, 10}_0 ∧ true) 
c  in CNF:
c     b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ false 
c  in DIMACS:
 15275 -15276 -15277  0
c  -3 does not represent an automaton state.
c    -( b^{32, 10}_2 ∧  b^{32, 10}_1 ∧  b^{32, 10}_0 ∧ true) 
c  in CNF:
c    -b^{32, 10}_2 ∨ -b^{32, 10}_1 ∨ -b^{32, 10}_0 ∨ false 
c  in DIMACS:
-15275 -15276 -15277  0

c i = 11
c  -2+1 --> -1
c    ( b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧  p_352) -> ( b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0)
c  in CNF:
c    -b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨  b^{32, 12}_2
c    -b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_1
c    -b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨  b^{32, 12}_0
c  in DIMACS:
-15278 -15279  15280 -352  15281 0
-15278 -15279  15280 -352 -15282 0
-15278 -15279  15280 -352  15283 0

c  -1+1 --> 0
c    ( b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0 ∧  p_352) -> (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧ -b^{32, 12}_0)
c  in CNF:
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_2
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_1
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_0
c  in DIMACS:
-15278  15279 -15280 -352 -15281 0
-15278  15279 -15280 -352 -15282 0
-15278  15279 -15280 -352 -15283 0

c  0+1 --> 1
c    (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧  p_352) -> (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0)
c  in CNF:
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_2
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_1
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨  b^{32, 12}_0
c  in DIMACS:
 15278  15279  15280 -352 -15281 0
 15278  15279  15280 -352 -15282 0
 15278  15279  15280 -352  15283 0

c  1+1 --> 2
c    (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0 ∧  p_352) -> (-b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0)
c  in CNF:
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_2
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨  b^{32, 12}_1
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ -p_352 ∨ -b^{32, 12}_0
c  in DIMACS:
 15278  15279 -15280 -352 -15281 0
 15278  15279 -15280 -352  15282 0
 15278  15279 -15280 -352 -15283 0

c  2+1 --> break 
c    (-b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧  p_352) -> break
c  in CNF:
c     b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 15278 -15279  15280 -352 1162 0


c  2-1 --> 1
c    (-b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧ -p_352) -> (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0)
c  in CNF:
c     b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_2
c     b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_1
c     b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨  b^{32, 12}_0
c  in DIMACS:
 15278 -15279  15280  352 -15281 0
 15278 -15279  15280  352 -15282 0
 15278 -15279  15280  352  15283 0

c  1-1 --> 0
c    (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0 ∧ -p_352) -> (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧ -b^{32, 12}_0)
c  in CNF:
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_2
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_1
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_0
c  in DIMACS:
 15278  15279 -15280  352 -15281 0
 15278  15279 -15280  352 -15282 0
 15278  15279 -15280  352 -15283 0

c  0-1 --> -1
c    (-b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧ -p_352) -> ( b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0)
c  in CNF:
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨  b^{32, 12}_2
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_1
c     b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨  b^{32, 12}_0
c  in DIMACS:
 15278  15279  15280  352  15281 0
 15278  15279  15280  352 -15282 0
 15278  15279  15280  352  15283 0

c  -1-1 --> -2
c    ( b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧  b^{32, 11}_0 ∧ -p_352) -> ( b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0)
c  in CNF:
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨  b^{32, 12}_2
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨  b^{32, 12}_1
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨  p_352 ∨ -b^{32, 12}_0
c  in DIMACS:
-15278  15279 -15280  352  15281 0
-15278  15279 -15280  352  15282 0
-15278  15279 -15280  352 -15283 0

c  -2-1 --> break 
c    ( b^{32, 11}_2 ∧  b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨  b^{32, 11}_0 ∨  p_352 ∨ break
c  in DIMACS:
-15278 -15279  15280  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 11}_2 ∧ -b^{32, 11}_1 ∧ -b^{32, 11}_0 ∧ true) 
c  in CNF:
c    -b^{32, 11}_2 ∨  b^{32, 11}_1 ∨  b^{32, 11}_0 ∨ false 
c  in DIMACS:
-15278  15279  15280  0

c  3 does not represent an automaton state.
c    -(-b^{32, 11}_2 ∧  b^{32, 11}_1 ∧  b^{32, 11}_0 ∧ true) 
c  in CNF:
c     b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ false 
c  in DIMACS:
 15278 -15279 -15280  0
c  -3 does not represent an automaton state.
c    -( b^{32, 11}_2 ∧  b^{32, 11}_1 ∧  b^{32, 11}_0 ∧ true) 
c  in CNF:
c    -b^{32, 11}_2 ∨ -b^{32, 11}_1 ∨ -b^{32, 11}_0 ∨ false 
c  in DIMACS:
-15278 -15279 -15280  0

c i = 12
c  -2+1 --> -1
c    ( b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧  p_384) -> ( b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0)
c  in CNF:
c    -b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨  b^{32, 13}_2
c    -b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_1
c    -b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨  b^{32, 13}_0
c  in DIMACS:
-15281 -15282  15283 -384  15284 0
-15281 -15282  15283 -384 -15285 0
-15281 -15282  15283 -384  15286 0

c  -1+1 --> 0
c    ( b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0 ∧  p_384) -> (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧ -b^{32, 13}_0)
c  in CNF:
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_2
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_1
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_0
c  in DIMACS:
-15281  15282 -15283 -384 -15284 0
-15281  15282 -15283 -384 -15285 0
-15281  15282 -15283 -384 -15286 0

c  0+1 --> 1
c    (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧  p_384) -> (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0)
c  in CNF:
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_2
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_1
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨  b^{32, 13}_0
c  in DIMACS:
 15281  15282  15283 -384 -15284 0
 15281  15282  15283 -384 -15285 0
 15281  15282  15283 -384  15286 0

c  1+1 --> 2
c    (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0 ∧  p_384) -> (-b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0)
c  in CNF:
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_2
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨  b^{32, 13}_1
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ -p_384 ∨ -b^{32, 13}_0
c  in DIMACS:
 15281  15282 -15283 -384 -15284 0
 15281  15282 -15283 -384  15285 0
 15281  15282 -15283 -384 -15286 0

c  2+1 --> break 
c    (-b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧  p_384) -> break
c  in CNF:
c     b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 15281 -15282  15283 -384 1162 0


c  2-1 --> 1
c    (-b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧ -p_384) -> (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0)
c  in CNF:
c     b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_2
c     b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_1
c     b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨  b^{32, 13}_0
c  in DIMACS:
 15281 -15282  15283  384 -15284 0
 15281 -15282  15283  384 -15285 0
 15281 -15282  15283  384  15286 0

c  1-1 --> 0
c    (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0 ∧ -p_384) -> (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧ -b^{32, 13}_0)
c  in CNF:
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_2
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_1
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_0
c  in DIMACS:
 15281  15282 -15283  384 -15284 0
 15281  15282 -15283  384 -15285 0
 15281  15282 -15283  384 -15286 0

c  0-1 --> -1
c    (-b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧ -p_384) -> ( b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0)
c  in CNF:
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨  b^{32, 13}_2
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_1
c     b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨  b^{32, 13}_0
c  in DIMACS:
 15281  15282  15283  384  15284 0
 15281  15282  15283  384 -15285 0
 15281  15282  15283  384  15286 0

c  -1-1 --> -2
c    ( b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧  b^{32, 12}_0 ∧ -p_384) -> ( b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0)
c  in CNF:
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨  b^{32, 13}_2
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨  b^{32, 13}_1
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨  p_384 ∨ -b^{32, 13}_0
c  in DIMACS:
-15281  15282 -15283  384  15284 0
-15281  15282 -15283  384  15285 0
-15281  15282 -15283  384 -15286 0

c  -2-1 --> break 
c    ( b^{32, 12}_2 ∧  b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨  b^{32, 12}_0 ∨  p_384 ∨ break
c  in DIMACS:
-15281 -15282  15283  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 12}_2 ∧ -b^{32, 12}_1 ∧ -b^{32, 12}_0 ∧ true) 
c  in CNF:
c    -b^{32, 12}_2 ∨  b^{32, 12}_1 ∨  b^{32, 12}_0 ∨ false 
c  in DIMACS:
-15281  15282  15283  0

c  3 does not represent an automaton state.
c    -(-b^{32, 12}_2 ∧  b^{32, 12}_1 ∧  b^{32, 12}_0 ∧ true) 
c  in CNF:
c     b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ false 
c  in DIMACS:
 15281 -15282 -15283  0
c  -3 does not represent an automaton state.
c    -( b^{32, 12}_2 ∧  b^{32, 12}_1 ∧  b^{32, 12}_0 ∧ true) 
c  in CNF:
c    -b^{32, 12}_2 ∨ -b^{32, 12}_1 ∨ -b^{32, 12}_0 ∨ false 
c  in DIMACS:
-15281 -15282 -15283  0

c i = 13
c  -2+1 --> -1
c    ( b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧  p_416) -> ( b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0)
c  in CNF:
c    -b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨  b^{32, 14}_2
c    -b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_1
c    -b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨  b^{32, 14}_0
c  in DIMACS:
-15284 -15285  15286 -416  15287 0
-15284 -15285  15286 -416 -15288 0
-15284 -15285  15286 -416  15289 0

c  -1+1 --> 0
c    ( b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0 ∧  p_416) -> (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧ -b^{32, 14}_0)
c  in CNF:
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_2
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_1
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_0
c  in DIMACS:
-15284  15285 -15286 -416 -15287 0
-15284  15285 -15286 -416 -15288 0
-15284  15285 -15286 -416 -15289 0

c  0+1 --> 1
c    (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧  p_416) -> (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0)
c  in CNF:
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_2
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_1
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨  b^{32, 14}_0
c  in DIMACS:
 15284  15285  15286 -416 -15287 0
 15284  15285  15286 -416 -15288 0
 15284  15285  15286 -416  15289 0

c  1+1 --> 2
c    (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0 ∧  p_416) -> (-b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0)
c  in CNF:
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_2
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨  b^{32, 14}_1
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ -p_416 ∨ -b^{32, 14}_0
c  in DIMACS:
 15284  15285 -15286 -416 -15287 0
 15284  15285 -15286 -416  15288 0
 15284  15285 -15286 -416 -15289 0

c  2+1 --> break 
c    (-b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧  p_416) -> break
c  in CNF:
c     b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 15284 -15285  15286 -416 1162 0


c  2-1 --> 1
c    (-b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧ -p_416) -> (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0)
c  in CNF:
c     b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_2
c     b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_1
c     b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨  b^{32, 14}_0
c  in DIMACS:
 15284 -15285  15286  416 -15287 0
 15284 -15285  15286  416 -15288 0
 15284 -15285  15286  416  15289 0

c  1-1 --> 0
c    (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0 ∧ -p_416) -> (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧ -b^{32, 14}_0)
c  in CNF:
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_2
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_1
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_0
c  in DIMACS:
 15284  15285 -15286  416 -15287 0
 15284  15285 -15286  416 -15288 0
 15284  15285 -15286  416 -15289 0

c  0-1 --> -1
c    (-b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧ -p_416) -> ( b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0)
c  in CNF:
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨  b^{32, 14}_2
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_1
c     b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨  b^{32, 14}_0
c  in DIMACS:
 15284  15285  15286  416  15287 0
 15284  15285  15286  416 -15288 0
 15284  15285  15286  416  15289 0

c  -1-1 --> -2
c    ( b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧  b^{32, 13}_0 ∧ -p_416) -> ( b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0)
c  in CNF:
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨  b^{32, 14}_2
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨  b^{32, 14}_1
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨  p_416 ∨ -b^{32, 14}_0
c  in DIMACS:
-15284  15285 -15286  416  15287 0
-15284  15285 -15286  416  15288 0
-15284  15285 -15286  416 -15289 0

c  -2-1 --> break 
c    ( b^{32, 13}_2 ∧  b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨  b^{32, 13}_0 ∨  p_416 ∨ break
c  in DIMACS:
-15284 -15285  15286  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 13}_2 ∧ -b^{32, 13}_1 ∧ -b^{32, 13}_0 ∧ true) 
c  in CNF:
c    -b^{32, 13}_2 ∨  b^{32, 13}_1 ∨  b^{32, 13}_0 ∨ false 
c  in DIMACS:
-15284  15285  15286  0

c  3 does not represent an automaton state.
c    -(-b^{32, 13}_2 ∧  b^{32, 13}_1 ∧  b^{32, 13}_0 ∧ true) 
c  in CNF:
c     b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ false 
c  in DIMACS:
 15284 -15285 -15286  0
c  -3 does not represent an automaton state.
c    -( b^{32, 13}_2 ∧  b^{32, 13}_1 ∧  b^{32, 13}_0 ∧ true) 
c  in CNF:
c    -b^{32, 13}_2 ∨ -b^{32, 13}_1 ∨ -b^{32, 13}_0 ∨ false 
c  in DIMACS:
-15284 -15285 -15286  0

c i = 14
c  -2+1 --> -1
c    ( b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧  p_448) -> ( b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0)
c  in CNF:
c    -b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨  b^{32, 15}_2
c    -b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_1
c    -b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨  b^{32, 15}_0
c  in DIMACS:
-15287 -15288  15289 -448  15290 0
-15287 -15288  15289 -448 -15291 0
-15287 -15288  15289 -448  15292 0

c  -1+1 --> 0
c    ( b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0 ∧  p_448) -> (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧ -b^{32, 15}_0)
c  in CNF:
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_2
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_1
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_0
c  in DIMACS:
-15287  15288 -15289 -448 -15290 0
-15287  15288 -15289 -448 -15291 0
-15287  15288 -15289 -448 -15292 0

c  0+1 --> 1
c    (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧  p_448) -> (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0)
c  in CNF:
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_2
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_1
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨  b^{32, 15}_0
c  in DIMACS:
 15287  15288  15289 -448 -15290 0
 15287  15288  15289 -448 -15291 0
 15287  15288  15289 -448  15292 0

c  1+1 --> 2
c    (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0 ∧  p_448) -> (-b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0)
c  in CNF:
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_2
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨  b^{32, 15}_1
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ -p_448 ∨ -b^{32, 15}_0
c  in DIMACS:
 15287  15288 -15289 -448 -15290 0
 15287  15288 -15289 -448  15291 0
 15287  15288 -15289 -448 -15292 0

c  2+1 --> break 
c    (-b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧  p_448) -> break
c  in CNF:
c     b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 15287 -15288  15289 -448 1162 0


c  2-1 --> 1
c    (-b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧ -p_448) -> (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0)
c  in CNF:
c     b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_2
c     b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_1
c     b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨  b^{32, 15}_0
c  in DIMACS:
 15287 -15288  15289  448 -15290 0
 15287 -15288  15289  448 -15291 0
 15287 -15288  15289  448  15292 0

c  1-1 --> 0
c    (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0 ∧ -p_448) -> (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧ -b^{32, 15}_0)
c  in CNF:
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_2
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_1
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_0
c  in DIMACS:
 15287  15288 -15289  448 -15290 0
 15287  15288 -15289  448 -15291 0
 15287  15288 -15289  448 -15292 0

c  0-1 --> -1
c    (-b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧ -p_448) -> ( b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0)
c  in CNF:
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨  b^{32, 15}_2
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_1
c     b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨  b^{32, 15}_0
c  in DIMACS:
 15287  15288  15289  448  15290 0
 15287  15288  15289  448 -15291 0
 15287  15288  15289  448  15292 0

c  -1-1 --> -2
c    ( b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧  b^{32, 14}_0 ∧ -p_448) -> ( b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0)
c  in CNF:
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨  b^{32, 15}_2
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨  b^{32, 15}_1
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨  p_448 ∨ -b^{32, 15}_0
c  in DIMACS:
-15287  15288 -15289  448  15290 0
-15287  15288 -15289  448  15291 0
-15287  15288 -15289  448 -15292 0

c  -2-1 --> break 
c    ( b^{32, 14}_2 ∧  b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨  b^{32, 14}_0 ∨  p_448 ∨ break
c  in DIMACS:
-15287 -15288  15289  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 14}_2 ∧ -b^{32, 14}_1 ∧ -b^{32, 14}_0 ∧ true) 
c  in CNF:
c    -b^{32, 14}_2 ∨  b^{32, 14}_1 ∨  b^{32, 14}_0 ∨ false 
c  in DIMACS:
-15287  15288  15289  0

c  3 does not represent an automaton state.
c    -(-b^{32, 14}_2 ∧  b^{32, 14}_1 ∧  b^{32, 14}_0 ∧ true) 
c  in CNF:
c     b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ false 
c  in DIMACS:
 15287 -15288 -15289  0
c  -3 does not represent an automaton state.
c    -( b^{32, 14}_2 ∧  b^{32, 14}_1 ∧  b^{32, 14}_0 ∧ true) 
c  in CNF:
c    -b^{32, 14}_2 ∨ -b^{32, 14}_1 ∨ -b^{32, 14}_0 ∨ false 
c  in DIMACS:
-15287 -15288 -15289  0

c i = 15
c  -2+1 --> -1
c    ( b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧  p_480) -> ( b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0)
c  in CNF:
c    -b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨  b^{32, 16}_2
c    -b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_1
c    -b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨  b^{32, 16}_0
c  in DIMACS:
-15290 -15291  15292 -480  15293 0
-15290 -15291  15292 -480 -15294 0
-15290 -15291  15292 -480  15295 0

c  -1+1 --> 0
c    ( b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0 ∧  p_480) -> (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧ -b^{32, 16}_0)
c  in CNF:
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_2
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_1
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_0
c  in DIMACS:
-15290  15291 -15292 -480 -15293 0
-15290  15291 -15292 -480 -15294 0
-15290  15291 -15292 -480 -15295 0

c  0+1 --> 1
c    (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧  p_480) -> (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0)
c  in CNF:
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_2
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_1
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨  b^{32, 16}_0
c  in DIMACS:
 15290  15291  15292 -480 -15293 0
 15290  15291  15292 -480 -15294 0
 15290  15291  15292 -480  15295 0

c  1+1 --> 2
c    (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0 ∧  p_480) -> (-b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0)
c  in CNF:
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_2
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨  b^{32, 16}_1
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ -p_480 ∨ -b^{32, 16}_0
c  in DIMACS:
 15290  15291 -15292 -480 -15293 0
 15290  15291 -15292 -480  15294 0
 15290  15291 -15292 -480 -15295 0

c  2+1 --> break 
c    (-b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧  p_480) -> break
c  in CNF:
c     b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 15290 -15291  15292 -480 1162 0


c  2-1 --> 1
c    (-b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧ -p_480) -> (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0)
c  in CNF:
c     b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_2
c     b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_1
c     b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨  b^{32, 16}_0
c  in DIMACS:
 15290 -15291  15292  480 -15293 0
 15290 -15291  15292  480 -15294 0
 15290 -15291  15292  480  15295 0

c  1-1 --> 0
c    (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0 ∧ -p_480) -> (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧ -b^{32, 16}_0)
c  in CNF:
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_2
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_1
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_0
c  in DIMACS:
 15290  15291 -15292  480 -15293 0
 15290  15291 -15292  480 -15294 0
 15290  15291 -15292  480 -15295 0

c  0-1 --> -1
c    (-b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧ -p_480) -> ( b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0)
c  in CNF:
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨  b^{32, 16}_2
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_1
c     b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨  b^{32, 16}_0
c  in DIMACS:
 15290  15291  15292  480  15293 0
 15290  15291  15292  480 -15294 0
 15290  15291  15292  480  15295 0

c  -1-1 --> -2
c    ( b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧  b^{32, 15}_0 ∧ -p_480) -> ( b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0)
c  in CNF:
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨  b^{32, 16}_2
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨  b^{32, 16}_1
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨  p_480 ∨ -b^{32, 16}_0
c  in DIMACS:
-15290  15291 -15292  480  15293 0
-15290  15291 -15292  480  15294 0
-15290  15291 -15292  480 -15295 0

c  -2-1 --> break 
c    ( b^{32, 15}_2 ∧  b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨  b^{32, 15}_0 ∨  p_480 ∨ break
c  in DIMACS:
-15290 -15291  15292  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 15}_2 ∧ -b^{32, 15}_1 ∧ -b^{32, 15}_0 ∧ true) 
c  in CNF:
c    -b^{32, 15}_2 ∨  b^{32, 15}_1 ∨  b^{32, 15}_0 ∨ false 
c  in DIMACS:
-15290  15291  15292  0

c  3 does not represent an automaton state.
c    -(-b^{32, 15}_2 ∧  b^{32, 15}_1 ∧  b^{32, 15}_0 ∧ true) 
c  in CNF:
c     b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ false 
c  in DIMACS:
 15290 -15291 -15292  0
c  -3 does not represent an automaton state.
c    -( b^{32, 15}_2 ∧  b^{32, 15}_1 ∧  b^{32, 15}_0 ∧ true) 
c  in CNF:
c    -b^{32, 15}_2 ∨ -b^{32, 15}_1 ∨ -b^{32, 15}_0 ∨ false 
c  in DIMACS:
-15290 -15291 -15292  0

c i = 16
c  -2+1 --> -1
c    ( b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧  p_512) -> ( b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0)
c  in CNF:
c    -b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨  b^{32, 17}_2
c    -b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_1
c    -b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨  b^{32, 17}_0
c  in DIMACS:
-15293 -15294  15295 -512  15296 0
-15293 -15294  15295 -512 -15297 0
-15293 -15294  15295 -512  15298 0

c  -1+1 --> 0
c    ( b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0 ∧  p_512) -> (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧ -b^{32, 17}_0)
c  in CNF:
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_2
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_1
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_0
c  in DIMACS:
-15293  15294 -15295 -512 -15296 0
-15293  15294 -15295 -512 -15297 0
-15293  15294 -15295 -512 -15298 0

c  0+1 --> 1
c    (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧  p_512) -> (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0)
c  in CNF:
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_2
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_1
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨  b^{32, 17}_0
c  in DIMACS:
 15293  15294  15295 -512 -15296 0
 15293  15294  15295 -512 -15297 0
 15293  15294  15295 -512  15298 0

c  1+1 --> 2
c    (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0 ∧  p_512) -> (-b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0)
c  in CNF:
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_2
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨  b^{32, 17}_1
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ -p_512 ∨ -b^{32, 17}_0
c  in DIMACS:
 15293  15294 -15295 -512 -15296 0
 15293  15294 -15295 -512  15297 0
 15293  15294 -15295 -512 -15298 0

c  2+1 --> break 
c    (-b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧  p_512) -> break
c  in CNF:
c     b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 15293 -15294  15295 -512 1162 0


c  2-1 --> 1
c    (-b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧ -p_512) -> (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0)
c  in CNF:
c     b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_2
c     b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_1
c     b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨  b^{32, 17}_0
c  in DIMACS:
 15293 -15294  15295  512 -15296 0
 15293 -15294  15295  512 -15297 0
 15293 -15294  15295  512  15298 0

c  1-1 --> 0
c    (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0 ∧ -p_512) -> (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧ -b^{32, 17}_0)
c  in CNF:
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_2
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_1
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_0
c  in DIMACS:
 15293  15294 -15295  512 -15296 0
 15293  15294 -15295  512 -15297 0
 15293  15294 -15295  512 -15298 0

c  0-1 --> -1
c    (-b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧ -p_512) -> ( b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0)
c  in CNF:
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨  b^{32, 17}_2
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_1
c     b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨  b^{32, 17}_0
c  in DIMACS:
 15293  15294  15295  512  15296 0
 15293  15294  15295  512 -15297 0
 15293  15294  15295  512  15298 0

c  -1-1 --> -2
c    ( b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧  b^{32, 16}_0 ∧ -p_512) -> ( b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0)
c  in CNF:
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨  b^{32, 17}_2
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨  b^{32, 17}_1
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨  p_512 ∨ -b^{32, 17}_0
c  in DIMACS:
-15293  15294 -15295  512  15296 0
-15293  15294 -15295  512  15297 0
-15293  15294 -15295  512 -15298 0

c  -2-1 --> break 
c    ( b^{32, 16}_2 ∧  b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨  b^{32, 16}_0 ∨  p_512 ∨ break
c  in DIMACS:
-15293 -15294  15295  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 16}_2 ∧ -b^{32, 16}_1 ∧ -b^{32, 16}_0 ∧ true) 
c  in CNF:
c    -b^{32, 16}_2 ∨  b^{32, 16}_1 ∨  b^{32, 16}_0 ∨ false 
c  in DIMACS:
-15293  15294  15295  0

c  3 does not represent an automaton state.
c    -(-b^{32, 16}_2 ∧  b^{32, 16}_1 ∧  b^{32, 16}_0 ∧ true) 
c  in CNF:
c     b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ false 
c  in DIMACS:
 15293 -15294 -15295  0
c  -3 does not represent an automaton state.
c    -( b^{32, 16}_2 ∧  b^{32, 16}_1 ∧  b^{32, 16}_0 ∧ true) 
c  in CNF:
c    -b^{32, 16}_2 ∨ -b^{32, 16}_1 ∨ -b^{32, 16}_0 ∨ false 
c  in DIMACS:
-15293 -15294 -15295  0

c i = 17
c  -2+1 --> -1
c    ( b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧  p_544) -> ( b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0)
c  in CNF:
c    -b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨  b^{32, 18}_2
c    -b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_1
c    -b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨  b^{32, 18}_0
c  in DIMACS:
-15296 -15297  15298 -544  15299 0
-15296 -15297  15298 -544 -15300 0
-15296 -15297  15298 -544  15301 0

c  -1+1 --> 0
c    ( b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0 ∧  p_544) -> (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧ -b^{32, 18}_0)
c  in CNF:
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_2
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_1
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_0
c  in DIMACS:
-15296  15297 -15298 -544 -15299 0
-15296  15297 -15298 -544 -15300 0
-15296  15297 -15298 -544 -15301 0

c  0+1 --> 1
c    (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧  p_544) -> (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0)
c  in CNF:
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_2
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_1
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨  b^{32, 18}_0
c  in DIMACS:
 15296  15297  15298 -544 -15299 0
 15296  15297  15298 -544 -15300 0
 15296  15297  15298 -544  15301 0

c  1+1 --> 2
c    (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0 ∧  p_544) -> (-b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0)
c  in CNF:
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_2
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨  b^{32, 18}_1
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ -p_544 ∨ -b^{32, 18}_0
c  in DIMACS:
 15296  15297 -15298 -544 -15299 0
 15296  15297 -15298 -544  15300 0
 15296  15297 -15298 -544 -15301 0

c  2+1 --> break 
c    (-b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧  p_544) -> break
c  in CNF:
c     b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 15296 -15297  15298 -544 1162 0


c  2-1 --> 1
c    (-b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧ -p_544) -> (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0)
c  in CNF:
c     b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_2
c     b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_1
c     b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨  b^{32, 18}_0
c  in DIMACS:
 15296 -15297  15298  544 -15299 0
 15296 -15297  15298  544 -15300 0
 15296 -15297  15298  544  15301 0

c  1-1 --> 0
c    (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0 ∧ -p_544) -> (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧ -b^{32, 18}_0)
c  in CNF:
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_2
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_1
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_0
c  in DIMACS:
 15296  15297 -15298  544 -15299 0
 15296  15297 -15298  544 -15300 0
 15296  15297 -15298  544 -15301 0

c  0-1 --> -1
c    (-b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧ -p_544) -> ( b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0)
c  in CNF:
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨  b^{32, 18}_2
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_1
c     b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨  b^{32, 18}_0
c  in DIMACS:
 15296  15297  15298  544  15299 0
 15296  15297  15298  544 -15300 0
 15296  15297  15298  544  15301 0

c  -1-1 --> -2
c    ( b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧  b^{32, 17}_0 ∧ -p_544) -> ( b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0)
c  in CNF:
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨  b^{32, 18}_2
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨  b^{32, 18}_1
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨  p_544 ∨ -b^{32, 18}_0
c  in DIMACS:
-15296  15297 -15298  544  15299 0
-15296  15297 -15298  544  15300 0
-15296  15297 -15298  544 -15301 0

c  -2-1 --> break 
c    ( b^{32, 17}_2 ∧  b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨  b^{32, 17}_0 ∨  p_544 ∨ break
c  in DIMACS:
-15296 -15297  15298  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 17}_2 ∧ -b^{32, 17}_1 ∧ -b^{32, 17}_0 ∧ true) 
c  in CNF:
c    -b^{32, 17}_2 ∨  b^{32, 17}_1 ∨  b^{32, 17}_0 ∨ false 
c  in DIMACS:
-15296  15297  15298  0

c  3 does not represent an automaton state.
c    -(-b^{32, 17}_2 ∧  b^{32, 17}_1 ∧  b^{32, 17}_0 ∧ true) 
c  in CNF:
c     b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ false 
c  in DIMACS:
 15296 -15297 -15298  0
c  -3 does not represent an automaton state.
c    -( b^{32, 17}_2 ∧  b^{32, 17}_1 ∧  b^{32, 17}_0 ∧ true) 
c  in CNF:
c    -b^{32, 17}_2 ∨ -b^{32, 17}_1 ∨ -b^{32, 17}_0 ∨ false 
c  in DIMACS:
-15296 -15297 -15298  0

c i = 18
c  -2+1 --> -1
c    ( b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧  p_576) -> ( b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0)
c  in CNF:
c    -b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨  b^{32, 19}_2
c    -b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_1
c    -b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨  b^{32, 19}_0
c  in DIMACS:
-15299 -15300  15301 -576  15302 0
-15299 -15300  15301 -576 -15303 0
-15299 -15300  15301 -576  15304 0

c  -1+1 --> 0
c    ( b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0 ∧  p_576) -> (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧ -b^{32, 19}_0)
c  in CNF:
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_2
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_1
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_0
c  in DIMACS:
-15299  15300 -15301 -576 -15302 0
-15299  15300 -15301 -576 -15303 0
-15299  15300 -15301 -576 -15304 0

c  0+1 --> 1
c    (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧  p_576) -> (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0)
c  in CNF:
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_2
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_1
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨  b^{32, 19}_0
c  in DIMACS:
 15299  15300  15301 -576 -15302 0
 15299  15300  15301 -576 -15303 0
 15299  15300  15301 -576  15304 0

c  1+1 --> 2
c    (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0 ∧  p_576) -> (-b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0)
c  in CNF:
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_2
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨  b^{32, 19}_1
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ -p_576 ∨ -b^{32, 19}_0
c  in DIMACS:
 15299  15300 -15301 -576 -15302 0
 15299  15300 -15301 -576  15303 0
 15299  15300 -15301 -576 -15304 0

c  2+1 --> break 
c    (-b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧  p_576) -> break
c  in CNF:
c     b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 15299 -15300  15301 -576 1162 0


c  2-1 --> 1
c    (-b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧ -p_576) -> (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0)
c  in CNF:
c     b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_2
c     b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_1
c     b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨  b^{32, 19}_0
c  in DIMACS:
 15299 -15300  15301  576 -15302 0
 15299 -15300  15301  576 -15303 0
 15299 -15300  15301  576  15304 0

c  1-1 --> 0
c    (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0 ∧ -p_576) -> (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧ -b^{32, 19}_0)
c  in CNF:
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_2
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_1
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_0
c  in DIMACS:
 15299  15300 -15301  576 -15302 0
 15299  15300 -15301  576 -15303 0
 15299  15300 -15301  576 -15304 0

c  0-1 --> -1
c    (-b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧ -p_576) -> ( b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0)
c  in CNF:
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨  b^{32, 19}_2
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_1
c     b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨  b^{32, 19}_0
c  in DIMACS:
 15299  15300  15301  576  15302 0
 15299  15300  15301  576 -15303 0
 15299  15300  15301  576  15304 0

c  -1-1 --> -2
c    ( b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧  b^{32, 18}_0 ∧ -p_576) -> ( b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0)
c  in CNF:
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨  b^{32, 19}_2
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨  b^{32, 19}_1
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨  p_576 ∨ -b^{32, 19}_0
c  in DIMACS:
-15299  15300 -15301  576  15302 0
-15299  15300 -15301  576  15303 0
-15299  15300 -15301  576 -15304 0

c  -2-1 --> break 
c    ( b^{32, 18}_2 ∧  b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨  b^{32, 18}_0 ∨  p_576 ∨ break
c  in DIMACS:
-15299 -15300  15301  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 18}_2 ∧ -b^{32, 18}_1 ∧ -b^{32, 18}_0 ∧ true) 
c  in CNF:
c    -b^{32, 18}_2 ∨  b^{32, 18}_1 ∨  b^{32, 18}_0 ∨ false 
c  in DIMACS:
-15299  15300  15301  0

c  3 does not represent an automaton state.
c    -(-b^{32, 18}_2 ∧  b^{32, 18}_1 ∧  b^{32, 18}_0 ∧ true) 
c  in CNF:
c     b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ false 
c  in DIMACS:
 15299 -15300 -15301  0
c  -3 does not represent an automaton state.
c    -( b^{32, 18}_2 ∧  b^{32, 18}_1 ∧  b^{32, 18}_0 ∧ true) 
c  in CNF:
c    -b^{32, 18}_2 ∨ -b^{32, 18}_1 ∨ -b^{32, 18}_0 ∨ false 
c  in DIMACS:
-15299 -15300 -15301  0

c i = 19
c  -2+1 --> -1
c    ( b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧  p_608) -> ( b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0)
c  in CNF:
c    -b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨  b^{32, 20}_2
c    -b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_1
c    -b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨  b^{32, 20}_0
c  in DIMACS:
-15302 -15303  15304 -608  15305 0
-15302 -15303  15304 -608 -15306 0
-15302 -15303  15304 -608  15307 0

c  -1+1 --> 0
c    ( b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0 ∧  p_608) -> (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧ -b^{32, 20}_0)
c  in CNF:
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_2
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_1
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_0
c  in DIMACS:
-15302  15303 -15304 -608 -15305 0
-15302  15303 -15304 -608 -15306 0
-15302  15303 -15304 -608 -15307 0

c  0+1 --> 1
c    (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧  p_608) -> (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0)
c  in CNF:
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_2
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_1
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨  b^{32, 20}_0
c  in DIMACS:
 15302  15303  15304 -608 -15305 0
 15302  15303  15304 -608 -15306 0
 15302  15303  15304 -608  15307 0

c  1+1 --> 2
c    (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0 ∧  p_608) -> (-b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0)
c  in CNF:
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_2
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨  b^{32, 20}_1
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ -p_608 ∨ -b^{32, 20}_0
c  in DIMACS:
 15302  15303 -15304 -608 -15305 0
 15302  15303 -15304 -608  15306 0
 15302  15303 -15304 -608 -15307 0

c  2+1 --> break 
c    (-b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧  p_608) -> break
c  in CNF:
c     b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 15302 -15303  15304 -608 1162 0


c  2-1 --> 1
c    (-b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧ -p_608) -> (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0)
c  in CNF:
c     b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_2
c     b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_1
c     b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨  b^{32, 20}_0
c  in DIMACS:
 15302 -15303  15304  608 -15305 0
 15302 -15303  15304  608 -15306 0
 15302 -15303  15304  608  15307 0

c  1-1 --> 0
c    (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0 ∧ -p_608) -> (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧ -b^{32, 20}_0)
c  in CNF:
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_2
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_1
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_0
c  in DIMACS:
 15302  15303 -15304  608 -15305 0
 15302  15303 -15304  608 -15306 0
 15302  15303 -15304  608 -15307 0

c  0-1 --> -1
c    (-b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧ -p_608) -> ( b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0)
c  in CNF:
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨  b^{32, 20}_2
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_1
c     b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨  b^{32, 20}_0
c  in DIMACS:
 15302  15303  15304  608  15305 0
 15302  15303  15304  608 -15306 0
 15302  15303  15304  608  15307 0

c  -1-1 --> -2
c    ( b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧  b^{32, 19}_0 ∧ -p_608) -> ( b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0)
c  in CNF:
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨  b^{32, 20}_2
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨  b^{32, 20}_1
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨  p_608 ∨ -b^{32, 20}_0
c  in DIMACS:
-15302  15303 -15304  608  15305 0
-15302  15303 -15304  608  15306 0
-15302  15303 -15304  608 -15307 0

c  -2-1 --> break 
c    ( b^{32, 19}_2 ∧  b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨  b^{32, 19}_0 ∨  p_608 ∨ break
c  in DIMACS:
-15302 -15303  15304  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 19}_2 ∧ -b^{32, 19}_1 ∧ -b^{32, 19}_0 ∧ true) 
c  in CNF:
c    -b^{32, 19}_2 ∨  b^{32, 19}_1 ∨  b^{32, 19}_0 ∨ false 
c  in DIMACS:
-15302  15303  15304  0

c  3 does not represent an automaton state.
c    -(-b^{32, 19}_2 ∧  b^{32, 19}_1 ∧  b^{32, 19}_0 ∧ true) 
c  in CNF:
c     b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ false 
c  in DIMACS:
 15302 -15303 -15304  0
c  -3 does not represent an automaton state.
c    -( b^{32, 19}_2 ∧  b^{32, 19}_1 ∧  b^{32, 19}_0 ∧ true) 
c  in CNF:
c    -b^{32, 19}_2 ∨ -b^{32, 19}_1 ∨ -b^{32, 19}_0 ∨ false 
c  in DIMACS:
-15302 -15303 -15304  0

c i = 20
c  -2+1 --> -1
c    ( b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧  p_640) -> ( b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0)
c  in CNF:
c    -b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨  b^{32, 21}_2
c    -b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_1
c    -b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨  b^{32, 21}_0
c  in DIMACS:
-15305 -15306  15307 -640  15308 0
-15305 -15306  15307 -640 -15309 0
-15305 -15306  15307 -640  15310 0

c  -1+1 --> 0
c    ( b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0 ∧  p_640) -> (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧ -b^{32, 21}_0)
c  in CNF:
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_2
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_1
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_0
c  in DIMACS:
-15305  15306 -15307 -640 -15308 0
-15305  15306 -15307 -640 -15309 0
-15305  15306 -15307 -640 -15310 0

c  0+1 --> 1
c    (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧  p_640) -> (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0)
c  in CNF:
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_2
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_1
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨  b^{32, 21}_0
c  in DIMACS:
 15305  15306  15307 -640 -15308 0
 15305  15306  15307 -640 -15309 0
 15305  15306  15307 -640  15310 0

c  1+1 --> 2
c    (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0 ∧  p_640) -> (-b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0)
c  in CNF:
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_2
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨  b^{32, 21}_1
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ -p_640 ∨ -b^{32, 21}_0
c  in DIMACS:
 15305  15306 -15307 -640 -15308 0
 15305  15306 -15307 -640  15309 0
 15305  15306 -15307 -640 -15310 0

c  2+1 --> break 
c    (-b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧  p_640) -> break
c  in CNF:
c     b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 15305 -15306  15307 -640 1162 0


c  2-1 --> 1
c    (-b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧ -p_640) -> (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0)
c  in CNF:
c     b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_2
c     b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_1
c     b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨  b^{32, 21}_0
c  in DIMACS:
 15305 -15306  15307  640 -15308 0
 15305 -15306  15307  640 -15309 0
 15305 -15306  15307  640  15310 0

c  1-1 --> 0
c    (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0 ∧ -p_640) -> (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧ -b^{32, 21}_0)
c  in CNF:
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_2
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_1
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_0
c  in DIMACS:
 15305  15306 -15307  640 -15308 0
 15305  15306 -15307  640 -15309 0
 15305  15306 -15307  640 -15310 0

c  0-1 --> -1
c    (-b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧ -p_640) -> ( b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0)
c  in CNF:
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨  b^{32, 21}_2
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_1
c     b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨  b^{32, 21}_0
c  in DIMACS:
 15305  15306  15307  640  15308 0
 15305  15306  15307  640 -15309 0
 15305  15306  15307  640  15310 0

c  -1-1 --> -2
c    ( b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧  b^{32, 20}_0 ∧ -p_640) -> ( b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0)
c  in CNF:
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨  b^{32, 21}_2
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨  b^{32, 21}_1
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨  p_640 ∨ -b^{32, 21}_0
c  in DIMACS:
-15305  15306 -15307  640  15308 0
-15305  15306 -15307  640  15309 0
-15305  15306 -15307  640 -15310 0

c  -2-1 --> break 
c    ( b^{32, 20}_2 ∧  b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨  b^{32, 20}_0 ∨  p_640 ∨ break
c  in DIMACS:
-15305 -15306  15307  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 20}_2 ∧ -b^{32, 20}_1 ∧ -b^{32, 20}_0 ∧ true) 
c  in CNF:
c    -b^{32, 20}_2 ∨  b^{32, 20}_1 ∨  b^{32, 20}_0 ∨ false 
c  in DIMACS:
-15305  15306  15307  0

c  3 does not represent an automaton state.
c    -(-b^{32, 20}_2 ∧  b^{32, 20}_1 ∧  b^{32, 20}_0 ∧ true) 
c  in CNF:
c     b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ false 
c  in DIMACS:
 15305 -15306 -15307  0
c  -3 does not represent an automaton state.
c    -( b^{32, 20}_2 ∧  b^{32, 20}_1 ∧  b^{32, 20}_0 ∧ true) 
c  in CNF:
c    -b^{32, 20}_2 ∨ -b^{32, 20}_1 ∨ -b^{32, 20}_0 ∨ false 
c  in DIMACS:
-15305 -15306 -15307  0

c i = 21
c  -2+1 --> -1
c    ( b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧  p_672) -> ( b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0)
c  in CNF:
c    -b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨  b^{32, 22}_2
c    -b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_1
c    -b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨  b^{32, 22}_0
c  in DIMACS:
-15308 -15309  15310 -672  15311 0
-15308 -15309  15310 -672 -15312 0
-15308 -15309  15310 -672  15313 0

c  -1+1 --> 0
c    ( b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0 ∧  p_672) -> (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧ -b^{32, 22}_0)
c  in CNF:
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_2
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_1
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_0
c  in DIMACS:
-15308  15309 -15310 -672 -15311 0
-15308  15309 -15310 -672 -15312 0
-15308  15309 -15310 -672 -15313 0

c  0+1 --> 1
c    (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧  p_672) -> (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0)
c  in CNF:
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_2
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_1
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨  b^{32, 22}_0
c  in DIMACS:
 15308  15309  15310 -672 -15311 0
 15308  15309  15310 -672 -15312 0
 15308  15309  15310 -672  15313 0

c  1+1 --> 2
c    (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0 ∧  p_672) -> (-b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0)
c  in CNF:
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_2
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨  b^{32, 22}_1
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ -p_672 ∨ -b^{32, 22}_0
c  in DIMACS:
 15308  15309 -15310 -672 -15311 0
 15308  15309 -15310 -672  15312 0
 15308  15309 -15310 -672 -15313 0

c  2+1 --> break 
c    (-b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧  p_672) -> break
c  in CNF:
c     b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 15308 -15309  15310 -672 1162 0


c  2-1 --> 1
c    (-b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧ -p_672) -> (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0)
c  in CNF:
c     b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_2
c     b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_1
c     b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨  b^{32, 22}_0
c  in DIMACS:
 15308 -15309  15310  672 -15311 0
 15308 -15309  15310  672 -15312 0
 15308 -15309  15310  672  15313 0

c  1-1 --> 0
c    (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0 ∧ -p_672) -> (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧ -b^{32, 22}_0)
c  in CNF:
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_2
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_1
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_0
c  in DIMACS:
 15308  15309 -15310  672 -15311 0
 15308  15309 -15310  672 -15312 0
 15308  15309 -15310  672 -15313 0

c  0-1 --> -1
c    (-b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧ -p_672) -> ( b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0)
c  in CNF:
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨  b^{32, 22}_2
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_1
c     b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨  b^{32, 22}_0
c  in DIMACS:
 15308  15309  15310  672  15311 0
 15308  15309  15310  672 -15312 0
 15308  15309  15310  672  15313 0

c  -1-1 --> -2
c    ( b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧  b^{32, 21}_0 ∧ -p_672) -> ( b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0)
c  in CNF:
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨  b^{32, 22}_2
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨  b^{32, 22}_1
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨  p_672 ∨ -b^{32, 22}_0
c  in DIMACS:
-15308  15309 -15310  672  15311 0
-15308  15309 -15310  672  15312 0
-15308  15309 -15310  672 -15313 0

c  -2-1 --> break 
c    ( b^{32, 21}_2 ∧  b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨  b^{32, 21}_0 ∨  p_672 ∨ break
c  in DIMACS:
-15308 -15309  15310  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 21}_2 ∧ -b^{32, 21}_1 ∧ -b^{32, 21}_0 ∧ true) 
c  in CNF:
c    -b^{32, 21}_2 ∨  b^{32, 21}_1 ∨  b^{32, 21}_0 ∨ false 
c  in DIMACS:
-15308  15309  15310  0

c  3 does not represent an automaton state.
c    -(-b^{32, 21}_2 ∧  b^{32, 21}_1 ∧  b^{32, 21}_0 ∧ true) 
c  in CNF:
c     b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ false 
c  in DIMACS:
 15308 -15309 -15310  0
c  -3 does not represent an automaton state.
c    -( b^{32, 21}_2 ∧  b^{32, 21}_1 ∧  b^{32, 21}_0 ∧ true) 
c  in CNF:
c    -b^{32, 21}_2 ∨ -b^{32, 21}_1 ∨ -b^{32, 21}_0 ∨ false 
c  in DIMACS:
-15308 -15309 -15310  0

c i = 22
c  -2+1 --> -1
c    ( b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧  p_704) -> ( b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0)
c  in CNF:
c    -b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨  b^{32, 23}_2
c    -b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_1
c    -b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨  b^{32, 23}_0
c  in DIMACS:
-15311 -15312  15313 -704  15314 0
-15311 -15312  15313 -704 -15315 0
-15311 -15312  15313 -704  15316 0

c  -1+1 --> 0
c    ( b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0 ∧  p_704) -> (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧ -b^{32, 23}_0)
c  in CNF:
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_2
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_1
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_0
c  in DIMACS:
-15311  15312 -15313 -704 -15314 0
-15311  15312 -15313 -704 -15315 0
-15311  15312 -15313 -704 -15316 0

c  0+1 --> 1
c    (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧  p_704) -> (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0)
c  in CNF:
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_2
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_1
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨  b^{32, 23}_0
c  in DIMACS:
 15311  15312  15313 -704 -15314 0
 15311  15312  15313 -704 -15315 0
 15311  15312  15313 -704  15316 0

c  1+1 --> 2
c    (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0 ∧  p_704) -> (-b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0)
c  in CNF:
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_2
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨  b^{32, 23}_1
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ -p_704 ∨ -b^{32, 23}_0
c  in DIMACS:
 15311  15312 -15313 -704 -15314 0
 15311  15312 -15313 -704  15315 0
 15311  15312 -15313 -704 -15316 0

c  2+1 --> break 
c    (-b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧  p_704) -> break
c  in CNF:
c     b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 15311 -15312  15313 -704 1162 0


c  2-1 --> 1
c    (-b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧ -p_704) -> (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0)
c  in CNF:
c     b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_2
c     b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_1
c     b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨  b^{32, 23}_0
c  in DIMACS:
 15311 -15312  15313  704 -15314 0
 15311 -15312  15313  704 -15315 0
 15311 -15312  15313  704  15316 0

c  1-1 --> 0
c    (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0 ∧ -p_704) -> (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧ -b^{32, 23}_0)
c  in CNF:
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_2
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_1
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_0
c  in DIMACS:
 15311  15312 -15313  704 -15314 0
 15311  15312 -15313  704 -15315 0
 15311  15312 -15313  704 -15316 0

c  0-1 --> -1
c    (-b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧ -p_704) -> ( b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0)
c  in CNF:
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨  b^{32, 23}_2
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_1
c     b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨  b^{32, 23}_0
c  in DIMACS:
 15311  15312  15313  704  15314 0
 15311  15312  15313  704 -15315 0
 15311  15312  15313  704  15316 0

c  -1-1 --> -2
c    ( b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧  b^{32, 22}_0 ∧ -p_704) -> ( b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0)
c  in CNF:
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨  b^{32, 23}_2
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨  b^{32, 23}_1
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨  p_704 ∨ -b^{32, 23}_0
c  in DIMACS:
-15311  15312 -15313  704  15314 0
-15311  15312 -15313  704  15315 0
-15311  15312 -15313  704 -15316 0

c  -2-1 --> break 
c    ( b^{32, 22}_2 ∧  b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨  b^{32, 22}_0 ∨  p_704 ∨ break
c  in DIMACS:
-15311 -15312  15313  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 22}_2 ∧ -b^{32, 22}_1 ∧ -b^{32, 22}_0 ∧ true) 
c  in CNF:
c    -b^{32, 22}_2 ∨  b^{32, 22}_1 ∨  b^{32, 22}_0 ∨ false 
c  in DIMACS:
-15311  15312  15313  0

c  3 does not represent an automaton state.
c    -(-b^{32, 22}_2 ∧  b^{32, 22}_1 ∧  b^{32, 22}_0 ∧ true) 
c  in CNF:
c     b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ false 
c  in DIMACS:
 15311 -15312 -15313  0
c  -3 does not represent an automaton state.
c    -( b^{32, 22}_2 ∧  b^{32, 22}_1 ∧  b^{32, 22}_0 ∧ true) 
c  in CNF:
c    -b^{32, 22}_2 ∨ -b^{32, 22}_1 ∨ -b^{32, 22}_0 ∨ false 
c  in DIMACS:
-15311 -15312 -15313  0

c i = 23
c  -2+1 --> -1
c    ( b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧  p_736) -> ( b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0)
c  in CNF:
c    -b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨  b^{32, 24}_2
c    -b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_1
c    -b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨  b^{32, 24}_0
c  in DIMACS:
-15314 -15315  15316 -736  15317 0
-15314 -15315  15316 -736 -15318 0
-15314 -15315  15316 -736  15319 0

c  -1+1 --> 0
c    ( b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0 ∧  p_736) -> (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧ -b^{32, 24}_0)
c  in CNF:
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_2
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_1
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_0
c  in DIMACS:
-15314  15315 -15316 -736 -15317 0
-15314  15315 -15316 -736 -15318 0
-15314  15315 -15316 -736 -15319 0

c  0+1 --> 1
c    (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧  p_736) -> (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0)
c  in CNF:
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_2
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_1
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨  b^{32, 24}_0
c  in DIMACS:
 15314  15315  15316 -736 -15317 0
 15314  15315  15316 -736 -15318 0
 15314  15315  15316 -736  15319 0

c  1+1 --> 2
c    (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0 ∧  p_736) -> (-b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0)
c  in CNF:
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_2
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨  b^{32, 24}_1
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ -p_736 ∨ -b^{32, 24}_0
c  in DIMACS:
 15314  15315 -15316 -736 -15317 0
 15314  15315 -15316 -736  15318 0
 15314  15315 -15316 -736 -15319 0

c  2+1 --> break 
c    (-b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧  p_736) -> break
c  in CNF:
c     b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 15314 -15315  15316 -736 1162 0


c  2-1 --> 1
c    (-b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧ -p_736) -> (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0)
c  in CNF:
c     b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_2
c     b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_1
c     b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨  b^{32, 24}_0
c  in DIMACS:
 15314 -15315  15316  736 -15317 0
 15314 -15315  15316  736 -15318 0
 15314 -15315  15316  736  15319 0

c  1-1 --> 0
c    (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0 ∧ -p_736) -> (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧ -b^{32, 24}_0)
c  in CNF:
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_2
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_1
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_0
c  in DIMACS:
 15314  15315 -15316  736 -15317 0
 15314  15315 -15316  736 -15318 0
 15314  15315 -15316  736 -15319 0

c  0-1 --> -1
c    (-b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧ -p_736) -> ( b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0)
c  in CNF:
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨  b^{32, 24}_2
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_1
c     b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨  b^{32, 24}_0
c  in DIMACS:
 15314  15315  15316  736  15317 0
 15314  15315  15316  736 -15318 0
 15314  15315  15316  736  15319 0

c  -1-1 --> -2
c    ( b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧  b^{32, 23}_0 ∧ -p_736) -> ( b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0)
c  in CNF:
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨  b^{32, 24}_2
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨  b^{32, 24}_1
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨  p_736 ∨ -b^{32, 24}_0
c  in DIMACS:
-15314  15315 -15316  736  15317 0
-15314  15315 -15316  736  15318 0
-15314  15315 -15316  736 -15319 0

c  -2-1 --> break 
c    ( b^{32, 23}_2 ∧  b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨  b^{32, 23}_0 ∨  p_736 ∨ break
c  in DIMACS:
-15314 -15315  15316  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 23}_2 ∧ -b^{32, 23}_1 ∧ -b^{32, 23}_0 ∧ true) 
c  in CNF:
c    -b^{32, 23}_2 ∨  b^{32, 23}_1 ∨  b^{32, 23}_0 ∨ false 
c  in DIMACS:
-15314  15315  15316  0

c  3 does not represent an automaton state.
c    -(-b^{32, 23}_2 ∧  b^{32, 23}_1 ∧  b^{32, 23}_0 ∧ true) 
c  in CNF:
c     b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ false 
c  in DIMACS:
 15314 -15315 -15316  0
c  -3 does not represent an automaton state.
c    -( b^{32, 23}_2 ∧  b^{32, 23}_1 ∧  b^{32, 23}_0 ∧ true) 
c  in CNF:
c    -b^{32, 23}_2 ∨ -b^{32, 23}_1 ∨ -b^{32, 23}_0 ∨ false 
c  in DIMACS:
-15314 -15315 -15316  0

c i = 24
c  -2+1 --> -1
c    ( b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧  p_768) -> ( b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0)
c  in CNF:
c    -b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨  b^{32, 25}_2
c    -b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_1
c    -b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨  b^{32, 25}_0
c  in DIMACS:
-15317 -15318  15319 -768  15320 0
-15317 -15318  15319 -768 -15321 0
-15317 -15318  15319 -768  15322 0

c  -1+1 --> 0
c    ( b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0 ∧  p_768) -> (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧ -b^{32, 25}_0)
c  in CNF:
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_2
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_1
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_0
c  in DIMACS:
-15317  15318 -15319 -768 -15320 0
-15317  15318 -15319 -768 -15321 0
-15317  15318 -15319 -768 -15322 0

c  0+1 --> 1
c    (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧  p_768) -> (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0)
c  in CNF:
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_2
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_1
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨  b^{32, 25}_0
c  in DIMACS:
 15317  15318  15319 -768 -15320 0
 15317  15318  15319 -768 -15321 0
 15317  15318  15319 -768  15322 0

c  1+1 --> 2
c    (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0 ∧  p_768) -> (-b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0)
c  in CNF:
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_2
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨  b^{32, 25}_1
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ -p_768 ∨ -b^{32, 25}_0
c  in DIMACS:
 15317  15318 -15319 -768 -15320 0
 15317  15318 -15319 -768  15321 0
 15317  15318 -15319 -768 -15322 0

c  2+1 --> break 
c    (-b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧  p_768) -> break
c  in CNF:
c     b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 15317 -15318  15319 -768 1162 0


c  2-1 --> 1
c    (-b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧ -p_768) -> (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0)
c  in CNF:
c     b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_2
c     b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_1
c     b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨  b^{32, 25}_0
c  in DIMACS:
 15317 -15318  15319  768 -15320 0
 15317 -15318  15319  768 -15321 0
 15317 -15318  15319  768  15322 0

c  1-1 --> 0
c    (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0 ∧ -p_768) -> (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧ -b^{32, 25}_0)
c  in CNF:
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_2
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_1
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_0
c  in DIMACS:
 15317  15318 -15319  768 -15320 0
 15317  15318 -15319  768 -15321 0
 15317  15318 -15319  768 -15322 0

c  0-1 --> -1
c    (-b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧ -p_768) -> ( b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0)
c  in CNF:
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨  b^{32, 25}_2
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_1
c     b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨  b^{32, 25}_0
c  in DIMACS:
 15317  15318  15319  768  15320 0
 15317  15318  15319  768 -15321 0
 15317  15318  15319  768  15322 0

c  -1-1 --> -2
c    ( b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧  b^{32, 24}_0 ∧ -p_768) -> ( b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0)
c  in CNF:
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨  b^{32, 25}_2
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨  b^{32, 25}_1
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨  p_768 ∨ -b^{32, 25}_0
c  in DIMACS:
-15317  15318 -15319  768  15320 0
-15317  15318 -15319  768  15321 0
-15317  15318 -15319  768 -15322 0

c  -2-1 --> break 
c    ( b^{32, 24}_2 ∧  b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨  b^{32, 24}_0 ∨  p_768 ∨ break
c  in DIMACS:
-15317 -15318  15319  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 24}_2 ∧ -b^{32, 24}_1 ∧ -b^{32, 24}_0 ∧ true) 
c  in CNF:
c    -b^{32, 24}_2 ∨  b^{32, 24}_1 ∨  b^{32, 24}_0 ∨ false 
c  in DIMACS:
-15317  15318  15319  0

c  3 does not represent an automaton state.
c    -(-b^{32, 24}_2 ∧  b^{32, 24}_1 ∧  b^{32, 24}_0 ∧ true) 
c  in CNF:
c     b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ false 
c  in DIMACS:
 15317 -15318 -15319  0
c  -3 does not represent an automaton state.
c    -( b^{32, 24}_2 ∧  b^{32, 24}_1 ∧  b^{32, 24}_0 ∧ true) 
c  in CNF:
c    -b^{32, 24}_2 ∨ -b^{32, 24}_1 ∨ -b^{32, 24}_0 ∨ false 
c  in DIMACS:
-15317 -15318 -15319  0

c i = 25
c  -2+1 --> -1
c    ( b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧  p_800) -> ( b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0)
c  in CNF:
c    -b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨  b^{32, 26}_2
c    -b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_1
c    -b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨  b^{32, 26}_0
c  in DIMACS:
-15320 -15321  15322 -800  15323 0
-15320 -15321  15322 -800 -15324 0
-15320 -15321  15322 -800  15325 0

c  -1+1 --> 0
c    ( b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0 ∧  p_800) -> (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧ -b^{32, 26}_0)
c  in CNF:
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_2
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_1
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_0
c  in DIMACS:
-15320  15321 -15322 -800 -15323 0
-15320  15321 -15322 -800 -15324 0
-15320  15321 -15322 -800 -15325 0

c  0+1 --> 1
c    (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧  p_800) -> (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0)
c  in CNF:
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_2
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_1
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨  b^{32, 26}_0
c  in DIMACS:
 15320  15321  15322 -800 -15323 0
 15320  15321  15322 -800 -15324 0
 15320  15321  15322 -800  15325 0

c  1+1 --> 2
c    (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0 ∧  p_800) -> (-b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0)
c  in CNF:
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_2
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨  b^{32, 26}_1
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ -p_800 ∨ -b^{32, 26}_0
c  in DIMACS:
 15320  15321 -15322 -800 -15323 0
 15320  15321 -15322 -800  15324 0
 15320  15321 -15322 -800 -15325 0

c  2+1 --> break 
c    (-b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧  p_800) -> break
c  in CNF:
c     b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 15320 -15321  15322 -800 1162 0


c  2-1 --> 1
c    (-b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧ -p_800) -> (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0)
c  in CNF:
c     b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_2
c     b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_1
c     b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨  b^{32, 26}_0
c  in DIMACS:
 15320 -15321  15322  800 -15323 0
 15320 -15321  15322  800 -15324 0
 15320 -15321  15322  800  15325 0

c  1-1 --> 0
c    (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0 ∧ -p_800) -> (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧ -b^{32, 26}_0)
c  in CNF:
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_2
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_1
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_0
c  in DIMACS:
 15320  15321 -15322  800 -15323 0
 15320  15321 -15322  800 -15324 0
 15320  15321 -15322  800 -15325 0

c  0-1 --> -1
c    (-b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧ -p_800) -> ( b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0)
c  in CNF:
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨  b^{32, 26}_2
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_1
c     b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨  b^{32, 26}_0
c  in DIMACS:
 15320  15321  15322  800  15323 0
 15320  15321  15322  800 -15324 0
 15320  15321  15322  800  15325 0

c  -1-1 --> -2
c    ( b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧  b^{32, 25}_0 ∧ -p_800) -> ( b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0)
c  in CNF:
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨  b^{32, 26}_2
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨  b^{32, 26}_1
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨  p_800 ∨ -b^{32, 26}_0
c  in DIMACS:
-15320  15321 -15322  800  15323 0
-15320  15321 -15322  800  15324 0
-15320  15321 -15322  800 -15325 0

c  -2-1 --> break 
c    ( b^{32, 25}_2 ∧  b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨  b^{32, 25}_0 ∨  p_800 ∨ break
c  in DIMACS:
-15320 -15321  15322  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 25}_2 ∧ -b^{32, 25}_1 ∧ -b^{32, 25}_0 ∧ true) 
c  in CNF:
c    -b^{32, 25}_2 ∨  b^{32, 25}_1 ∨  b^{32, 25}_0 ∨ false 
c  in DIMACS:
-15320  15321  15322  0

c  3 does not represent an automaton state.
c    -(-b^{32, 25}_2 ∧  b^{32, 25}_1 ∧  b^{32, 25}_0 ∧ true) 
c  in CNF:
c     b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ false 
c  in DIMACS:
 15320 -15321 -15322  0
c  -3 does not represent an automaton state.
c    -( b^{32, 25}_2 ∧  b^{32, 25}_1 ∧  b^{32, 25}_0 ∧ true) 
c  in CNF:
c    -b^{32, 25}_2 ∨ -b^{32, 25}_1 ∨ -b^{32, 25}_0 ∨ false 
c  in DIMACS:
-15320 -15321 -15322  0

c i = 26
c  -2+1 --> -1
c    ( b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧  p_832) -> ( b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0)
c  in CNF:
c    -b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨  b^{32, 27}_2
c    -b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_1
c    -b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨  b^{32, 27}_0
c  in DIMACS:
-15323 -15324  15325 -832  15326 0
-15323 -15324  15325 -832 -15327 0
-15323 -15324  15325 -832  15328 0

c  -1+1 --> 0
c    ( b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0 ∧  p_832) -> (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧ -b^{32, 27}_0)
c  in CNF:
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_2
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_1
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_0
c  in DIMACS:
-15323  15324 -15325 -832 -15326 0
-15323  15324 -15325 -832 -15327 0
-15323  15324 -15325 -832 -15328 0

c  0+1 --> 1
c    (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧  p_832) -> (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0)
c  in CNF:
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_2
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_1
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨  b^{32, 27}_0
c  in DIMACS:
 15323  15324  15325 -832 -15326 0
 15323  15324  15325 -832 -15327 0
 15323  15324  15325 -832  15328 0

c  1+1 --> 2
c    (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0 ∧  p_832) -> (-b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0)
c  in CNF:
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_2
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨  b^{32, 27}_1
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ -p_832 ∨ -b^{32, 27}_0
c  in DIMACS:
 15323  15324 -15325 -832 -15326 0
 15323  15324 -15325 -832  15327 0
 15323  15324 -15325 -832 -15328 0

c  2+1 --> break 
c    (-b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧  p_832) -> break
c  in CNF:
c     b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 15323 -15324  15325 -832 1162 0


c  2-1 --> 1
c    (-b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧ -p_832) -> (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0)
c  in CNF:
c     b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_2
c     b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_1
c     b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨  b^{32, 27}_0
c  in DIMACS:
 15323 -15324  15325  832 -15326 0
 15323 -15324  15325  832 -15327 0
 15323 -15324  15325  832  15328 0

c  1-1 --> 0
c    (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0 ∧ -p_832) -> (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧ -b^{32, 27}_0)
c  in CNF:
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_2
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_1
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_0
c  in DIMACS:
 15323  15324 -15325  832 -15326 0
 15323  15324 -15325  832 -15327 0
 15323  15324 -15325  832 -15328 0

c  0-1 --> -1
c    (-b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧ -p_832) -> ( b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0)
c  in CNF:
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨  b^{32, 27}_2
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_1
c     b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨  b^{32, 27}_0
c  in DIMACS:
 15323  15324  15325  832  15326 0
 15323  15324  15325  832 -15327 0
 15323  15324  15325  832  15328 0

c  -1-1 --> -2
c    ( b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧  b^{32, 26}_0 ∧ -p_832) -> ( b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0)
c  in CNF:
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨  b^{32, 27}_2
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨  b^{32, 27}_1
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨  p_832 ∨ -b^{32, 27}_0
c  in DIMACS:
-15323  15324 -15325  832  15326 0
-15323  15324 -15325  832  15327 0
-15323  15324 -15325  832 -15328 0

c  -2-1 --> break 
c    ( b^{32, 26}_2 ∧  b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨  b^{32, 26}_0 ∨  p_832 ∨ break
c  in DIMACS:
-15323 -15324  15325  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 26}_2 ∧ -b^{32, 26}_1 ∧ -b^{32, 26}_0 ∧ true) 
c  in CNF:
c    -b^{32, 26}_2 ∨  b^{32, 26}_1 ∨  b^{32, 26}_0 ∨ false 
c  in DIMACS:
-15323  15324  15325  0

c  3 does not represent an automaton state.
c    -(-b^{32, 26}_2 ∧  b^{32, 26}_1 ∧  b^{32, 26}_0 ∧ true) 
c  in CNF:
c     b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ false 
c  in DIMACS:
 15323 -15324 -15325  0
c  -3 does not represent an automaton state.
c    -( b^{32, 26}_2 ∧  b^{32, 26}_1 ∧  b^{32, 26}_0 ∧ true) 
c  in CNF:
c    -b^{32, 26}_2 ∨ -b^{32, 26}_1 ∨ -b^{32, 26}_0 ∨ false 
c  in DIMACS:
-15323 -15324 -15325  0

c i = 27
c  -2+1 --> -1
c    ( b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧  p_864) -> ( b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0)
c  in CNF:
c    -b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨  b^{32, 28}_2
c    -b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_1
c    -b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨  b^{32, 28}_0
c  in DIMACS:
-15326 -15327  15328 -864  15329 0
-15326 -15327  15328 -864 -15330 0
-15326 -15327  15328 -864  15331 0

c  -1+1 --> 0
c    ( b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0 ∧  p_864) -> (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧ -b^{32, 28}_0)
c  in CNF:
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_2
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_1
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_0
c  in DIMACS:
-15326  15327 -15328 -864 -15329 0
-15326  15327 -15328 -864 -15330 0
-15326  15327 -15328 -864 -15331 0

c  0+1 --> 1
c    (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧  p_864) -> (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0)
c  in CNF:
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_2
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_1
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨  b^{32, 28}_0
c  in DIMACS:
 15326  15327  15328 -864 -15329 0
 15326  15327  15328 -864 -15330 0
 15326  15327  15328 -864  15331 0

c  1+1 --> 2
c    (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0 ∧  p_864) -> (-b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0)
c  in CNF:
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_2
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨  b^{32, 28}_1
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ -p_864 ∨ -b^{32, 28}_0
c  in DIMACS:
 15326  15327 -15328 -864 -15329 0
 15326  15327 -15328 -864  15330 0
 15326  15327 -15328 -864 -15331 0

c  2+1 --> break 
c    (-b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧  p_864) -> break
c  in CNF:
c     b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 15326 -15327  15328 -864 1162 0


c  2-1 --> 1
c    (-b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧ -p_864) -> (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0)
c  in CNF:
c     b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_2
c     b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_1
c     b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨  b^{32, 28}_0
c  in DIMACS:
 15326 -15327  15328  864 -15329 0
 15326 -15327  15328  864 -15330 0
 15326 -15327  15328  864  15331 0

c  1-1 --> 0
c    (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0 ∧ -p_864) -> (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧ -b^{32, 28}_0)
c  in CNF:
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_2
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_1
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_0
c  in DIMACS:
 15326  15327 -15328  864 -15329 0
 15326  15327 -15328  864 -15330 0
 15326  15327 -15328  864 -15331 0

c  0-1 --> -1
c    (-b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧ -p_864) -> ( b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0)
c  in CNF:
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨  b^{32, 28}_2
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_1
c     b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨  b^{32, 28}_0
c  in DIMACS:
 15326  15327  15328  864  15329 0
 15326  15327  15328  864 -15330 0
 15326  15327  15328  864  15331 0

c  -1-1 --> -2
c    ( b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧  b^{32, 27}_0 ∧ -p_864) -> ( b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0)
c  in CNF:
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨  b^{32, 28}_2
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨  b^{32, 28}_1
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨  p_864 ∨ -b^{32, 28}_0
c  in DIMACS:
-15326  15327 -15328  864  15329 0
-15326  15327 -15328  864  15330 0
-15326  15327 -15328  864 -15331 0

c  -2-1 --> break 
c    ( b^{32, 27}_2 ∧  b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨  b^{32, 27}_0 ∨  p_864 ∨ break
c  in DIMACS:
-15326 -15327  15328  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 27}_2 ∧ -b^{32, 27}_1 ∧ -b^{32, 27}_0 ∧ true) 
c  in CNF:
c    -b^{32, 27}_2 ∨  b^{32, 27}_1 ∨  b^{32, 27}_0 ∨ false 
c  in DIMACS:
-15326  15327  15328  0

c  3 does not represent an automaton state.
c    -(-b^{32, 27}_2 ∧  b^{32, 27}_1 ∧  b^{32, 27}_0 ∧ true) 
c  in CNF:
c     b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ false 
c  in DIMACS:
 15326 -15327 -15328  0
c  -3 does not represent an automaton state.
c    -( b^{32, 27}_2 ∧  b^{32, 27}_1 ∧  b^{32, 27}_0 ∧ true) 
c  in CNF:
c    -b^{32, 27}_2 ∨ -b^{32, 27}_1 ∨ -b^{32, 27}_0 ∨ false 
c  in DIMACS:
-15326 -15327 -15328  0

c i = 28
c  -2+1 --> -1
c    ( b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧  p_896) -> ( b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0)
c  in CNF:
c    -b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨  b^{32, 29}_2
c    -b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_1
c    -b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨  b^{32, 29}_0
c  in DIMACS:
-15329 -15330  15331 -896  15332 0
-15329 -15330  15331 -896 -15333 0
-15329 -15330  15331 -896  15334 0

c  -1+1 --> 0
c    ( b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0 ∧  p_896) -> (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧ -b^{32, 29}_0)
c  in CNF:
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_2
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_1
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_0
c  in DIMACS:
-15329  15330 -15331 -896 -15332 0
-15329  15330 -15331 -896 -15333 0
-15329  15330 -15331 -896 -15334 0

c  0+1 --> 1
c    (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧  p_896) -> (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0)
c  in CNF:
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_2
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_1
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨  b^{32, 29}_0
c  in DIMACS:
 15329  15330  15331 -896 -15332 0
 15329  15330  15331 -896 -15333 0
 15329  15330  15331 -896  15334 0

c  1+1 --> 2
c    (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0 ∧  p_896) -> (-b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0)
c  in CNF:
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_2
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨  b^{32, 29}_1
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ -p_896 ∨ -b^{32, 29}_0
c  in DIMACS:
 15329  15330 -15331 -896 -15332 0
 15329  15330 -15331 -896  15333 0
 15329  15330 -15331 -896 -15334 0

c  2+1 --> break 
c    (-b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧  p_896) -> break
c  in CNF:
c     b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 15329 -15330  15331 -896 1162 0


c  2-1 --> 1
c    (-b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧ -p_896) -> (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0)
c  in CNF:
c     b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_2
c     b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_1
c     b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨  b^{32, 29}_0
c  in DIMACS:
 15329 -15330  15331  896 -15332 0
 15329 -15330  15331  896 -15333 0
 15329 -15330  15331  896  15334 0

c  1-1 --> 0
c    (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0 ∧ -p_896) -> (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧ -b^{32, 29}_0)
c  in CNF:
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_2
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_1
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_0
c  in DIMACS:
 15329  15330 -15331  896 -15332 0
 15329  15330 -15331  896 -15333 0
 15329  15330 -15331  896 -15334 0

c  0-1 --> -1
c    (-b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧ -p_896) -> ( b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0)
c  in CNF:
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨  b^{32, 29}_2
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_1
c     b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨  b^{32, 29}_0
c  in DIMACS:
 15329  15330  15331  896  15332 0
 15329  15330  15331  896 -15333 0
 15329  15330  15331  896  15334 0

c  -1-1 --> -2
c    ( b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧  b^{32, 28}_0 ∧ -p_896) -> ( b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0)
c  in CNF:
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨  b^{32, 29}_2
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨  b^{32, 29}_1
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨  p_896 ∨ -b^{32, 29}_0
c  in DIMACS:
-15329  15330 -15331  896  15332 0
-15329  15330 -15331  896  15333 0
-15329  15330 -15331  896 -15334 0

c  -2-1 --> break 
c    ( b^{32, 28}_2 ∧  b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨  b^{32, 28}_0 ∨  p_896 ∨ break
c  in DIMACS:
-15329 -15330  15331  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 28}_2 ∧ -b^{32, 28}_1 ∧ -b^{32, 28}_0 ∧ true) 
c  in CNF:
c    -b^{32, 28}_2 ∨  b^{32, 28}_1 ∨  b^{32, 28}_0 ∨ false 
c  in DIMACS:
-15329  15330  15331  0

c  3 does not represent an automaton state.
c    -(-b^{32, 28}_2 ∧  b^{32, 28}_1 ∧  b^{32, 28}_0 ∧ true) 
c  in CNF:
c     b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ false 
c  in DIMACS:
 15329 -15330 -15331  0
c  -3 does not represent an automaton state.
c    -( b^{32, 28}_2 ∧  b^{32, 28}_1 ∧  b^{32, 28}_0 ∧ true) 
c  in CNF:
c    -b^{32, 28}_2 ∨ -b^{32, 28}_1 ∨ -b^{32, 28}_0 ∨ false 
c  in DIMACS:
-15329 -15330 -15331  0

c i = 29
c  -2+1 --> -1
c    ( b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧  p_928) -> ( b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0)
c  in CNF:
c    -b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨  b^{32, 30}_2
c    -b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_1
c    -b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨  b^{32, 30}_0
c  in DIMACS:
-15332 -15333  15334 -928  15335 0
-15332 -15333  15334 -928 -15336 0
-15332 -15333  15334 -928  15337 0

c  -1+1 --> 0
c    ( b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0 ∧  p_928) -> (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧ -b^{32, 30}_0)
c  in CNF:
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_2
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_1
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_0
c  in DIMACS:
-15332  15333 -15334 -928 -15335 0
-15332  15333 -15334 -928 -15336 0
-15332  15333 -15334 -928 -15337 0

c  0+1 --> 1
c    (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧  p_928) -> (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0)
c  in CNF:
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_2
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_1
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨  b^{32, 30}_0
c  in DIMACS:
 15332  15333  15334 -928 -15335 0
 15332  15333  15334 -928 -15336 0
 15332  15333  15334 -928  15337 0

c  1+1 --> 2
c    (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0 ∧  p_928) -> (-b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0)
c  in CNF:
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_2
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨  b^{32, 30}_1
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ -p_928 ∨ -b^{32, 30}_0
c  in DIMACS:
 15332  15333 -15334 -928 -15335 0
 15332  15333 -15334 -928  15336 0
 15332  15333 -15334 -928 -15337 0

c  2+1 --> break 
c    (-b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧  p_928) -> break
c  in CNF:
c     b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 15332 -15333  15334 -928 1162 0


c  2-1 --> 1
c    (-b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧ -p_928) -> (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0)
c  in CNF:
c     b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_2
c     b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_1
c     b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨  b^{32, 30}_0
c  in DIMACS:
 15332 -15333  15334  928 -15335 0
 15332 -15333  15334  928 -15336 0
 15332 -15333  15334  928  15337 0

c  1-1 --> 0
c    (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0 ∧ -p_928) -> (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧ -b^{32, 30}_0)
c  in CNF:
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_2
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_1
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_0
c  in DIMACS:
 15332  15333 -15334  928 -15335 0
 15332  15333 -15334  928 -15336 0
 15332  15333 -15334  928 -15337 0

c  0-1 --> -1
c    (-b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧ -p_928) -> ( b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0)
c  in CNF:
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨  b^{32, 30}_2
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_1
c     b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨  b^{32, 30}_0
c  in DIMACS:
 15332  15333  15334  928  15335 0
 15332  15333  15334  928 -15336 0
 15332  15333  15334  928  15337 0

c  -1-1 --> -2
c    ( b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧  b^{32, 29}_0 ∧ -p_928) -> ( b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0)
c  in CNF:
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨  b^{32, 30}_2
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨  b^{32, 30}_1
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨  p_928 ∨ -b^{32, 30}_0
c  in DIMACS:
-15332  15333 -15334  928  15335 0
-15332  15333 -15334  928  15336 0
-15332  15333 -15334  928 -15337 0

c  -2-1 --> break 
c    ( b^{32, 29}_2 ∧  b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨  b^{32, 29}_0 ∨  p_928 ∨ break
c  in DIMACS:
-15332 -15333  15334  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 29}_2 ∧ -b^{32, 29}_1 ∧ -b^{32, 29}_0 ∧ true) 
c  in CNF:
c    -b^{32, 29}_2 ∨  b^{32, 29}_1 ∨  b^{32, 29}_0 ∨ false 
c  in DIMACS:
-15332  15333  15334  0

c  3 does not represent an automaton state.
c    -(-b^{32, 29}_2 ∧  b^{32, 29}_1 ∧  b^{32, 29}_0 ∧ true) 
c  in CNF:
c     b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ false 
c  in DIMACS:
 15332 -15333 -15334  0
c  -3 does not represent an automaton state.
c    -( b^{32, 29}_2 ∧  b^{32, 29}_1 ∧  b^{32, 29}_0 ∧ true) 
c  in CNF:
c    -b^{32, 29}_2 ∨ -b^{32, 29}_1 ∨ -b^{32, 29}_0 ∨ false 
c  in DIMACS:
-15332 -15333 -15334  0

c i = 30
c  -2+1 --> -1
c    ( b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧  p_960) -> ( b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0)
c  in CNF:
c    -b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨  b^{32, 31}_2
c    -b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_1
c    -b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨  b^{32, 31}_0
c  in DIMACS:
-15335 -15336  15337 -960  15338 0
-15335 -15336  15337 -960 -15339 0
-15335 -15336  15337 -960  15340 0

c  -1+1 --> 0
c    ( b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0 ∧  p_960) -> (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧ -b^{32, 31}_0)
c  in CNF:
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_2
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_1
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_0
c  in DIMACS:
-15335  15336 -15337 -960 -15338 0
-15335  15336 -15337 -960 -15339 0
-15335  15336 -15337 -960 -15340 0

c  0+1 --> 1
c    (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧  p_960) -> (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0)
c  in CNF:
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_2
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_1
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨  b^{32, 31}_0
c  in DIMACS:
 15335  15336  15337 -960 -15338 0
 15335  15336  15337 -960 -15339 0
 15335  15336  15337 -960  15340 0

c  1+1 --> 2
c    (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0 ∧  p_960) -> (-b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0)
c  in CNF:
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_2
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨  b^{32, 31}_1
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ -p_960 ∨ -b^{32, 31}_0
c  in DIMACS:
 15335  15336 -15337 -960 -15338 0
 15335  15336 -15337 -960  15339 0
 15335  15336 -15337 -960 -15340 0

c  2+1 --> break 
c    (-b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧  p_960) -> break
c  in CNF:
c     b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 15335 -15336  15337 -960 1162 0


c  2-1 --> 1
c    (-b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧ -p_960) -> (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0)
c  in CNF:
c     b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_2
c     b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_1
c     b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨  b^{32, 31}_0
c  in DIMACS:
 15335 -15336  15337  960 -15338 0
 15335 -15336  15337  960 -15339 0
 15335 -15336  15337  960  15340 0

c  1-1 --> 0
c    (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0 ∧ -p_960) -> (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧ -b^{32, 31}_0)
c  in CNF:
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_2
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_1
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_0
c  in DIMACS:
 15335  15336 -15337  960 -15338 0
 15335  15336 -15337  960 -15339 0
 15335  15336 -15337  960 -15340 0

c  0-1 --> -1
c    (-b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧ -p_960) -> ( b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0)
c  in CNF:
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨  b^{32, 31}_2
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_1
c     b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨  b^{32, 31}_0
c  in DIMACS:
 15335  15336  15337  960  15338 0
 15335  15336  15337  960 -15339 0
 15335  15336  15337  960  15340 0

c  -1-1 --> -2
c    ( b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧  b^{32, 30}_0 ∧ -p_960) -> ( b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0)
c  in CNF:
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨  b^{32, 31}_2
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨  b^{32, 31}_1
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨  p_960 ∨ -b^{32, 31}_0
c  in DIMACS:
-15335  15336 -15337  960  15338 0
-15335  15336 -15337  960  15339 0
-15335  15336 -15337  960 -15340 0

c  -2-1 --> break 
c    ( b^{32, 30}_2 ∧  b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨  b^{32, 30}_0 ∨  p_960 ∨ break
c  in DIMACS:
-15335 -15336  15337  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 30}_2 ∧ -b^{32, 30}_1 ∧ -b^{32, 30}_0 ∧ true) 
c  in CNF:
c    -b^{32, 30}_2 ∨  b^{32, 30}_1 ∨  b^{32, 30}_0 ∨ false 
c  in DIMACS:
-15335  15336  15337  0

c  3 does not represent an automaton state.
c    -(-b^{32, 30}_2 ∧  b^{32, 30}_1 ∧  b^{32, 30}_0 ∧ true) 
c  in CNF:
c     b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ false 
c  in DIMACS:
 15335 -15336 -15337  0
c  -3 does not represent an automaton state.
c    -( b^{32, 30}_2 ∧  b^{32, 30}_1 ∧  b^{32, 30}_0 ∧ true) 
c  in CNF:
c    -b^{32, 30}_2 ∨ -b^{32, 30}_1 ∨ -b^{32, 30}_0 ∨ false 
c  in DIMACS:
-15335 -15336 -15337  0

c i = 31
c  -2+1 --> -1
c    ( b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧  p_992) -> ( b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0)
c  in CNF:
c    -b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨  b^{32, 32}_2
c    -b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_1
c    -b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨  b^{32, 32}_0
c  in DIMACS:
-15338 -15339  15340 -992  15341 0
-15338 -15339  15340 -992 -15342 0
-15338 -15339  15340 -992  15343 0

c  -1+1 --> 0
c    ( b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0 ∧  p_992) -> (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧ -b^{32, 32}_0)
c  in CNF:
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_2
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_1
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_0
c  in DIMACS:
-15338  15339 -15340 -992 -15341 0
-15338  15339 -15340 -992 -15342 0
-15338  15339 -15340 -992 -15343 0

c  0+1 --> 1
c    (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧  p_992) -> (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0)
c  in CNF:
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_2
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_1
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨  b^{32, 32}_0
c  in DIMACS:
 15338  15339  15340 -992 -15341 0
 15338  15339  15340 -992 -15342 0
 15338  15339  15340 -992  15343 0

c  1+1 --> 2
c    (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0 ∧  p_992) -> (-b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0)
c  in CNF:
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_2
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨  b^{32, 32}_1
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ -p_992 ∨ -b^{32, 32}_0
c  in DIMACS:
 15338  15339 -15340 -992 -15341 0
 15338  15339 -15340 -992  15342 0
 15338  15339 -15340 -992 -15343 0

c  2+1 --> break 
c    (-b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧  p_992) -> break
c  in CNF:
c     b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 15338 -15339  15340 -992 1162 0


c  2-1 --> 1
c    (-b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧ -p_992) -> (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0)
c  in CNF:
c     b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_2
c     b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_1
c     b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨  b^{32, 32}_0
c  in DIMACS:
 15338 -15339  15340  992 -15341 0
 15338 -15339  15340  992 -15342 0
 15338 -15339  15340  992  15343 0

c  1-1 --> 0
c    (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0 ∧ -p_992) -> (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧ -b^{32, 32}_0)
c  in CNF:
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_2
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_1
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_0
c  in DIMACS:
 15338  15339 -15340  992 -15341 0
 15338  15339 -15340  992 -15342 0
 15338  15339 -15340  992 -15343 0

c  0-1 --> -1
c    (-b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧ -p_992) -> ( b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0)
c  in CNF:
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨  b^{32, 32}_2
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_1
c     b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨  b^{32, 32}_0
c  in DIMACS:
 15338  15339  15340  992  15341 0
 15338  15339  15340  992 -15342 0
 15338  15339  15340  992  15343 0

c  -1-1 --> -2
c    ( b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧  b^{32, 31}_0 ∧ -p_992) -> ( b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0)
c  in CNF:
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨  b^{32, 32}_2
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨  b^{32, 32}_1
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨  p_992 ∨ -b^{32, 32}_0
c  in DIMACS:
-15338  15339 -15340  992  15341 0
-15338  15339 -15340  992  15342 0
-15338  15339 -15340  992 -15343 0

c  -2-1 --> break 
c    ( b^{32, 31}_2 ∧  b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨  b^{32, 31}_0 ∨  p_992 ∨ break
c  in DIMACS:
-15338 -15339  15340  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 31}_2 ∧ -b^{32, 31}_1 ∧ -b^{32, 31}_0 ∧ true) 
c  in CNF:
c    -b^{32, 31}_2 ∨  b^{32, 31}_1 ∨  b^{32, 31}_0 ∨ false 
c  in DIMACS:
-15338  15339  15340  0

c  3 does not represent an automaton state.
c    -(-b^{32, 31}_2 ∧  b^{32, 31}_1 ∧  b^{32, 31}_0 ∧ true) 
c  in CNF:
c     b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ false 
c  in DIMACS:
 15338 -15339 -15340  0
c  -3 does not represent an automaton state.
c    -( b^{32, 31}_2 ∧  b^{32, 31}_1 ∧  b^{32, 31}_0 ∧ true) 
c  in CNF:
c    -b^{32, 31}_2 ∨ -b^{32, 31}_1 ∨ -b^{32, 31}_0 ∨ false 
c  in DIMACS:
-15338 -15339 -15340  0

c i = 32
c  -2+1 --> -1
c    ( b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧  p_1024) -> ( b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0)
c  in CNF:
c    -b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨  b^{32, 33}_2
c    -b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_1
c    -b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨  b^{32, 33}_0
c  in DIMACS:
-15341 -15342  15343 -1024  15344 0
-15341 -15342  15343 -1024 -15345 0
-15341 -15342  15343 -1024  15346 0

c  -1+1 --> 0
c    ( b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0 ∧  p_1024) -> (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧ -b^{32, 33}_0)
c  in CNF:
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_2
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_1
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_0
c  in DIMACS:
-15341  15342 -15343 -1024 -15344 0
-15341  15342 -15343 -1024 -15345 0
-15341  15342 -15343 -1024 -15346 0

c  0+1 --> 1
c    (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧  p_1024) -> (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0)
c  in CNF:
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_2
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_1
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨  b^{32, 33}_0
c  in DIMACS:
 15341  15342  15343 -1024 -15344 0
 15341  15342  15343 -1024 -15345 0
 15341  15342  15343 -1024  15346 0

c  1+1 --> 2
c    (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0 ∧  p_1024) -> (-b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0)
c  in CNF:
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_2
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨  b^{32, 33}_1
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ -p_1024 ∨ -b^{32, 33}_0
c  in DIMACS:
 15341  15342 -15343 -1024 -15344 0
 15341  15342 -15343 -1024  15345 0
 15341  15342 -15343 -1024 -15346 0

c  2+1 --> break 
c    (-b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 15341 -15342  15343 -1024 1162 0


c  2-1 --> 1
c    (-b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧ -p_1024) -> (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0)
c  in CNF:
c     b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_2
c     b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_1
c     b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨  b^{32, 33}_0
c  in DIMACS:
 15341 -15342  15343  1024 -15344 0
 15341 -15342  15343  1024 -15345 0
 15341 -15342  15343  1024  15346 0

c  1-1 --> 0
c    (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0 ∧ -p_1024) -> (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧ -b^{32, 33}_0)
c  in CNF:
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_2
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_1
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_0
c  in DIMACS:
 15341  15342 -15343  1024 -15344 0
 15341  15342 -15343  1024 -15345 0
 15341  15342 -15343  1024 -15346 0

c  0-1 --> -1
c    (-b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧ -p_1024) -> ( b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0)
c  in CNF:
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨  b^{32, 33}_2
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_1
c     b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨  b^{32, 33}_0
c  in DIMACS:
 15341  15342  15343  1024  15344 0
 15341  15342  15343  1024 -15345 0
 15341  15342  15343  1024  15346 0

c  -1-1 --> -2
c    ( b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧  b^{32, 32}_0 ∧ -p_1024) -> ( b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0)
c  in CNF:
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨  b^{32, 33}_2
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨  b^{32, 33}_1
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨  p_1024 ∨ -b^{32, 33}_0
c  in DIMACS:
-15341  15342 -15343  1024  15344 0
-15341  15342 -15343  1024  15345 0
-15341  15342 -15343  1024 -15346 0

c  -2-1 --> break 
c    ( b^{32, 32}_2 ∧  b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨  b^{32, 32}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-15341 -15342  15343  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 32}_2 ∧ -b^{32, 32}_1 ∧ -b^{32, 32}_0 ∧ true) 
c  in CNF:
c    -b^{32, 32}_2 ∨  b^{32, 32}_1 ∨  b^{32, 32}_0 ∨ false 
c  in DIMACS:
-15341  15342  15343  0

c  3 does not represent an automaton state.
c    -(-b^{32, 32}_2 ∧  b^{32, 32}_1 ∧  b^{32, 32}_0 ∧ true) 
c  in CNF:
c     b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ false 
c  in DIMACS:
 15341 -15342 -15343  0
c  -3 does not represent an automaton state.
c    -( b^{32, 32}_2 ∧  b^{32, 32}_1 ∧  b^{32, 32}_0 ∧ true) 
c  in CNF:
c    -b^{32, 32}_2 ∨ -b^{32, 32}_1 ∨ -b^{32, 32}_0 ∨ false 
c  in DIMACS:
-15341 -15342 -15343  0

c i = 33
c  -2+1 --> -1
c    ( b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧  p_1056) -> ( b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0)
c  in CNF:
c    -b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨  b^{32, 34}_2
c    -b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_1
c    -b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨  b^{32, 34}_0
c  in DIMACS:
-15344 -15345  15346 -1056  15347 0
-15344 -15345  15346 -1056 -15348 0
-15344 -15345  15346 -1056  15349 0

c  -1+1 --> 0
c    ( b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0 ∧  p_1056) -> (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧ -b^{32, 34}_0)
c  in CNF:
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_2
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_1
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_0
c  in DIMACS:
-15344  15345 -15346 -1056 -15347 0
-15344  15345 -15346 -1056 -15348 0
-15344  15345 -15346 -1056 -15349 0

c  0+1 --> 1
c    (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧  p_1056) -> (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0)
c  in CNF:
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_2
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_1
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨  b^{32, 34}_0
c  in DIMACS:
 15344  15345  15346 -1056 -15347 0
 15344  15345  15346 -1056 -15348 0
 15344  15345  15346 -1056  15349 0

c  1+1 --> 2
c    (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0 ∧  p_1056) -> (-b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0)
c  in CNF:
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_2
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨  b^{32, 34}_1
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ -p_1056 ∨ -b^{32, 34}_0
c  in DIMACS:
 15344  15345 -15346 -1056 -15347 0
 15344  15345 -15346 -1056  15348 0
 15344  15345 -15346 -1056 -15349 0

c  2+1 --> break 
c    (-b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 15344 -15345  15346 -1056 1162 0


c  2-1 --> 1
c    (-b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧ -p_1056) -> (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0)
c  in CNF:
c     b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_2
c     b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_1
c     b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨  b^{32, 34}_0
c  in DIMACS:
 15344 -15345  15346  1056 -15347 0
 15344 -15345  15346  1056 -15348 0
 15344 -15345  15346  1056  15349 0

c  1-1 --> 0
c    (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0 ∧ -p_1056) -> (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧ -b^{32, 34}_0)
c  in CNF:
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_2
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_1
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_0
c  in DIMACS:
 15344  15345 -15346  1056 -15347 0
 15344  15345 -15346  1056 -15348 0
 15344  15345 -15346  1056 -15349 0

c  0-1 --> -1
c    (-b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧ -p_1056) -> ( b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0)
c  in CNF:
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨  b^{32, 34}_2
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_1
c     b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨  b^{32, 34}_0
c  in DIMACS:
 15344  15345  15346  1056  15347 0
 15344  15345  15346  1056 -15348 0
 15344  15345  15346  1056  15349 0

c  -1-1 --> -2
c    ( b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧  b^{32, 33}_0 ∧ -p_1056) -> ( b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0)
c  in CNF:
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨  b^{32, 34}_2
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨  b^{32, 34}_1
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨  p_1056 ∨ -b^{32, 34}_0
c  in DIMACS:
-15344  15345 -15346  1056  15347 0
-15344  15345 -15346  1056  15348 0
-15344  15345 -15346  1056 -15349 0

c  -2-1 --> break 
c    ( b^{32, 33}_2 ∧  b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨  b^{32, 33}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-15344 -15345  15346  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 33}_2 ∧ -b^{32, 33}_1 ∧ -b^{32, 33}_0 ∧ true) 
c  in CNF:
c    -b^{32, 33}_2 ∨  b^{32, 33}_1 ∨  b^{32, 33}_0 ∨ false 
c  in DIMACS:
-15344  15345  15346  0

c  3 does not represent an automaton state.
c    -(-b^{32, 33}_2 ∧  b^{32, 33}_1 ∧  b^{32, 33}_0 ∧ true) 
c  in CNF:
c     b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ false 
c  in DIMACS:
 15344 -15345 -15346  0
c  -3 does not represent an automaton state.
c    -( b^{32, 33}_2 ∧  b^{32, 33}_1 ∧  b^{32, 33}_0 ∧ true) 
c  in CNF:
c    -b^{32, 33}_2 ∨ -b^{32, 33}_1 ∨ -b^{32, 33}_0 ∨ false 
c  in DIMACS:
-15344 -15345 -15346  0

c i = 34
c  -2+1 --> -1
c    ( b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧  p_1088) -> ( b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0)
c  in CNF:
c    -b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨  b^{32, 35}_2
c    -b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_1
c    -b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨  b^{32, 35}_0
c  in DIMACS:
-15347 -15348  15349 -1088  15350 0
-15347 -15348  15349 -1088 -15351 0
-15347 -15348  15349 -1088  15352 0

c  -1+1 --> 0
c    ( b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0 ∧  p_1088) -> (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧ -b^{32, 35}_0)
c  in CNF:
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_2
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_1
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_0
c  in DIMACS:
-15347  15348 -15349 -1088 -15350 0
-15347  15348 -15349 -1088 -15351 0
-15347  15348 -15349 -1088 -15352 0

c  0+1 --> 1
c    (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧  p_1088) -> (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0)
c  in CNF:
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_2
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_1
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨  b^{32, 35}_0
c  in DIMACS:
 15347  15348  15349 -1088 -15350 0
 15347  15348  15349 -1088 -15351 0
 15347  15348  15349 -1088  15352 0

c  1+1 --> 2
c    (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0 ∧  p_1088) -> (-b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0)
c  in CNF:
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_2
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨  b^{32, 35}_1
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ -p_1088 ∨ -b^{32, 35}_0
c  in DIMACS:
 15347  15348 -15349 -1088 -15350 0
 15347  15348 -15349 -1088  15351 0
 15347  15348 -15349 -1088 -15352 0

c  2+1 --> break 
c    (-b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 15347 -15348  15349 -1088 1162 0


c  2-1 --> 1
c    (-b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧ -p_1088) -> (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0)
c  in CNF:
c     b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_2
c     b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_1
c     b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨  b^{32, 35}_0
c  in DIMACS:
 15347 -15348  15349  1088 -15350 0
 15347 -15348  15349  1088 -15351 0
 15347 -15348  15349  1088  15352 0

c  1-1 --> 0
c    (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0 ∧ -p_1088) -> (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧ -b^{32, 35}_0)
c  in CNF:
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_2
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_1
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_0
c  in DIMACS:
 15347  15348 -15349  1088 -15350 0
 15347  15348 -15349  1088 -15351 0
 15347  15348 -15349  1088 -15352 0

c  0-1 --> -1
c    (-b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧ -p_1088) -> ( b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0)
c  in CNF:
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨  b^{32, 35}_2
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_1
c     b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨  b^{32, 35}_0
c  in DIMACS:
 15347  15348  15349  1088  15350 0
 15347  15348  15349  1088 -15351 0
 15347  15348  15349  1088  15352 0

c  -1-1 --> -2
c    ( b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧  b^{32, 34}_0 ∧ -p_1088) -> ( b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0)
c  in CNF:
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨  b^{32, 35}_2
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨  b^{32, 35}_1
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨  p_1088 ∨ -b^{32, 35}_0
c  in DIMACS:
-15347  15348 -15349  1088  15350 0
-15347  15348 -15349  1088  15351 0
-15347  15348 -15349  1088 -15352 0

c  -2-1 --> break 
c    ( b^{32, 34}_2 ∧  b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨  b^{32, 34}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-15347 -15348  15349  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 34}_2 ∧ -b^{32, 34}_1 ∧ -b^{32, 34}_0 ∧ true) 
c  in CNF:
c    -b^{32, 34}_2 ∨  b^{32, 34}_1 ∨  b^{32, 34}_0 ∨ false 
c  in DIMACS:
-15347  15348  15349  0

c  3 does not represent an automaton state.
c    -(-b^{32, 34}_2 ∧  b^{32, 34}_1 ∧  b^{32, 34}_0 ∧ true) 
c  in CNF:
c     b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ false 
c  in DIMACS:
 15347 -15348 -15349  0
c  -3 does not represent an automaton state.
c    -( b^{32, 34}_2 ∧  b^{32, 34}_1 ∧  b^{32, 34}_0 ∧ true) 
c  in CNF:
c    -b^{32, 34}_2 ∨ -b^{32, 34}_1 ∨ -b^{32, 34}_0 ∨ false 
c  in DIMACS:
-15347 -15348 -15349  0

c i = 35
c  -2+1 --> -1
c    ( b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧  p_1120) -> ( b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0)
c  in CNF:
c    -b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨  b^{32, 36}_2
c    -b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_1
c    -b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨  b^{32, 36}_0
c  in DIMACS:
-15350 -15351  15352 -1120  15353 0
-15350 -15351  15352 -1120 -15354 0
-15350 -15351  15352 -1120  15355 0

c  -1+1 --> 0
c    ( b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0 ∧  p_1120) -> (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧ -b^{32, 36}_0)
c  in CNF:
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_2
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_1
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_0
c  in DIMACS:
-15350  15351 -15352 -1120 -15353 0
-15350  15351 -15352 -1120 -15354 0
-15350  15351 -15352 -1120 -15355 0

c  0+1 --> 1
c    (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧  p_1120) -> (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0)
c  in CNF:
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_2
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_1
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨  b^{32, 36}_0
c  in DIMACS:
 15350  15351  15352 -1120 -15353 0
 15350  15351  15352 -1120 -15354 0
 15350  15351  15352 -1120  15355 0

c  1+1 --> 2
c    (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0 ∧  p_1120) -> (-b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0)
c  in CNF:
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_2
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨  b^{32, 36}_1
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ -p_1120 ∨ -b^{32, 36}_0
c  in DIMACS:
 15350  15351 -15352 -1120 -15353 0
 15350  15351 -15352 -1120  15354 0
 15350  15351 -15352 -1120 -15355 0

c  2+1 --> break 
c    (-b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 15350 -15351  15352 -1120 1162 0


c  2-1 --> 1
c    (-b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧ -p_1120) -> (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0)
c  in CNF:
c     b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_2
c     b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_1
c     b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨  b^{32, 36}_0
c  in DIMACS:
 15350 -15351  15352  1120 -15353 0
 15350 -15351  15352  1120 -15354 0
 15350 -15351  15352  1120  15355 0

c  1-1 --> 0
c    (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0 ∧ -p_1120) -> (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧ -b^{32, 36}_0)
c  in CNF:
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_2
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_1
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_0
c  in DIMACS:
 15350  15351 -15352  1120 -15353 0
 15350  15351 -15352  1120 -15354 0
 15350  15351 -15352  1120 -15355 0

c  0-1 --> -1
c    (-b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧ -p_1120) -> ( b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0)
c  in CNF:
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨  b^{32, 36}_2
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_1
c     b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨  b^{32, 36}_0
c  in DIMACS:
 15350  15351  15352  1120  15353 0
 15350  15351  15352  1120 -15354 0
 15350  15351  15352  1120  15355 0

c  -1-1 --> -2
c    ( b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧  b^{32, 35}_0 ∧ -p_1120) -> ( b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0)
c  in CNF:
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨  b^{32, 36}_2
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨  b^{32, 36}_1
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨  p_1120 ∨ -b^{32, 36}_0
c  in DIMACS:
-15350  15351 -15352  1120  15353 0
-15350  15351 -15352  1120  15354 0
-15350  15351 -15352  1120 -15355 0

c  -2-1 --> break 
c    ( b^{32, 35}_2 ∧  b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨  b^{32, 35}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-15350 -15351  15352  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 35}_2 ∧ -b^{32, 35}_1 ∧ -b^{32, 35}_0 ∧ true) 
c  in CNF:
c    -b^{32, 35}_2 ∨  b^{32, 35}_1 ∨  b^{32, 35}_0 ∨ false 
c  in DIMACS:
-15350  15351  15352  0

c  3 does not represent an automaton state.
c    -(-b^{32, 35}_2 ∧  b^{32, 35}_1 ∧  b^{32, 35}_0 ∧ true) 
c  in CNF:
c     b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ false 
c  in DIMACS:
 15350 -15351 -15352  0
c  -3 does not represent an automaton state.
c    -( b^{32, 35}_2 ∧  b^{32, 35}_1 ∧  b^{32, 35}_0 ∧ true) 
c  in CNF:
c    -b^{32, 35}_2 ∨ -b^{32, 35}_1 ∨ -b^{32, 35}_0 ∨ false 
c  in DIMACS:
-15350 -15351 -15352  0

c i = 36
c  -2+1 --> -1
c    ( b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧  p_1152) -> ( b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧  b^{32, 37}_0)
c  in CNF:
c    -b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨  b^{32, 37}_2
c    -b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_1
c    -b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨  b^{32, 37}_0
c  in DIMACS:
-15353 -15354  15355 -1152  15356 0
-15353 -15354  15355 -1152 -15357 0
-15353 -15354  15355 -1152  15358 0

c  -1+1 --> 0
c    ( b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0 ∧  p_1152) -> (-b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧ -b^{32, 37}_0)
c  in CNF:
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_2
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_1
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_0
c  in DIMACS:
-15353  15354 -15355 -1152 -15356 0
-15353  15354 -15355 -1152 -15357 0
-15353  15354 -15355 -1152 -15358 0

c  0+1 --> 1
c    (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧  p_1152) -> (-b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧  b^{32, 37}_0)
c  in CNF:
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_2
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_1
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨  b^{32, 37}_0
c  in DIMACS:
 15353  15354  15355 -1152 -15356 0
 15353  15354  15355 -1152 -15357 0
 15353  15354  15355 -1152  15358 0

c  1+1 --> 2
c    (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0 ∧  p_1152) -> (-b^{32, 37}_2 ∧  b^{32, 37}_1 ∧ -b^{32, 37}_0)
c  in CNF:
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_2
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨  b^{32, 37}_1
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ -p_1152 ∨ -b^{32, 37}_0
c  in DIMACS:
 15353  15354 -15355 -1152 -15356 0
 15353  15354 -15355 -1152  15357 0
 15353  15354 -15355 -1152 -15358 0

c  2+1 --> break 
c    (-b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 15353 -15354  15355 -1152 1162 0


c  2-1 --> 1
c    (-b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧ -p_1152) -> (-b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧  b^{32, 37}_0)
c  in CNF:
c     b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_2
c     b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_1
c     b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨  b^{32, 37}_0
c  in DIMACS:
 15353 -15354  15355  1152 -15356 0
 15353 -15354  15355  1152 -15357 0
 15353 -15354  15355  1152  15358 0

c  1-1 --> 0
c    (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0 ∧ -p_1152) -> (-b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧ -b^{32, 37}_0)
c  in CNF:
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_2
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_1
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_0
c  in DIMACS:
 15353  15354 -15355  1152 -15356 0
 15353  15354 -15355  1152 -15357 0
 15353  15354 -15355  1152 -15358 0

c  0-1 --> -1
c    (-b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧ -p_1152) -> ( b^{32, 37}_2 ∧ -b^{32, 37}_1 ∧  b^{32, 37}_0)
c  in CNF:
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨  b^{32, 37}_2
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_1
c     b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨  b^{32, 37}_0
c  in DIMACS:
 15353  15354  15355  1152  15356 0
 15353  15354  15355  1152 -15357 0
 15353  15354  15355  1152  15358 0

c  -1-1 --> -2
c    ( b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧  b^{32, 36}_0 ∧ -p_1152) -> ( b^{32, 37}_2 ∧  b^{32, 37}_1 ∧ -b^{32, 37}_0)
c  in CNF:
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨  b^{32, 37}_2
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨  b^{32, 37}_1
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨  p_1152 ∨ -b^{32, 37}_0
c  in DIMACS:
-15353  15354 -15355  1152  15356 0
-15353  15354 -15355  1152  15357 0
-15353  15354 -15355  1152 -15358 0

c  -2-1 --> break 
c    ( b^{32, 36}_2 ∧  b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨  b^{32, 36}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-15353 -15354  15355  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{32, 36}_2 ∧ -b^{32, 36}_1 ∧ -b^{32, 36}_0 ∧ true) 
c  in CNF:
c    -b^{32, 36}_2 ∨  b^{32, 36}_1 ∨  b^{32, 36}_0 ∨ false 
c  in DIMACS:
-15353  15354  15355  0

c  3 does not represent an automaton state.
c    -(-b^{32, 36}_2 ∧  b^{32, 36}_1 ∧  b^{32, 36}_0 ∧ true) 
c  in CNF:
c     b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ false 
c  in DIMACS:
 15353 -15354 -15355  0
c  -3 does not represent an automaton state.
c    -( b^{32, 36}_2 ∧  b^{32, 36}_1 ∧  b^{32, 36}_0 ∧ true) 
c  in CNF:
c    -b^{32, 36}_2 ∨ -b^{32, 36}_1 ∨ -b^{32, 36}_0 ∨ false 
c  in DIMACS:
-15353 -15354 -15355  0

c INIT for k = 33
c    -b^{33, 1}_2
c    -b^{33, 1}_1
c    -b^{33, 1}_0
c  in DIMACS:
-15359 0
-15360 0
-15361 0

c Transitions for k = 33
c i = 1
c  -2+1 --> -1
c    ( b^{33, 1}_2 ∧  b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧  p_33) -> ( b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0)
c  in CNF:
c    -b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨  b^{33, 2}_2
c    -b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_1
c    -b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨  b^{33, 2}_0
c  in DIMACS:
-15359 -15360  15361 -33  15362 0
-15359 -15360  15361 -33 -15363 0
-15359 -15360  15361 -33  15364 0

c  -1+1 --> 0
c    ( b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧  b^{33, 1}_0 ∧  p_33) -> (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧ -b^{33, 2}_0)
c  in CNF:
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_2
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_1
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_0
c  in DIMACS:
-15359  15360 -15361 -33 -15362 0
-15359  15360 -15361 -33 -15363 0
-15359  15360 -15361 -33 -15364 0

c  0+1 --> 1
c    (-b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧  p_33) -> (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0)
c  in CNF:
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_2
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_1
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨  b^{33, 2}_0
c  in DIMACS:
 15359  15360  15361 -33 -15362 0
 15359  15360  15361 -33 -15363 0
 15359  15360  15361 -33  15364 0

c  1+1 --> 2
c    (-b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧  b^{33, 1}_0 ∧  p_33) -> (-b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0)
c  in CNF:
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_2
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨  b^{33, 2}_1
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ -p_33 ∨ -b^{33, 2}_0
c  in DIMACS:
 15359  15360 -15361 -33 -15362 0
 15359  15360 -15361 -33  15363 0
 15359  15360 -15361 -33 -15364 0

c  2+1 --> break 
c    (-b^{33, 1}_2 ∧  b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧  p_33) -> break
c  in CNF:
c     b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ -p_33 ∨ break
c  in DIMACS:
 15359 -15360  15361 -33 1162 0


c  2-1 --> 1
c    (-b^{33, 1}_2 ∧  b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧ -p_33) -> (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0)
c  in CNF:
c     b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_2
c     b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_1
c     b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨  b^{33, 2}_0
c  in DIMACS:
 15359 -15360  15361  33 -15362 0
 15359 -15360  15361  33 -15363 0
 15359 -15360  15361  33  15364 0

c  1-1 --> 0
c    (-b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧  b^{33, 1}_0 ∧ -p_33) -> (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧ -b^{33, 2}_0)
c  in CNF:
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_2
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_1
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_0
c  in DIMACS:
 15359  15360 -15361  33 -15362 0
 15359  15360 -15361  33 -15363 0
 15359  15360 -15361  33 -15364 0

c  0-1 --> -1
c    (-b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧ -p_33) -> ( b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0)
c  in CNF:
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨  b^{33, 2}_2
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_1
c     b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨  b^{33, 2}_0
c  in DIMACS:
 15359  15360  15361  33  15362 0
 15359  15360  15361  33 -15363 0
 15359  15360  15361  33  15364 0

c  -1-1 --> -2
c    ( b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧  b^{33, 1}_0 ∧ -p_33) -> ( b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0)
c  in CNF:
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨  b^{33, 2}_2
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨  b^{33, 2}_1
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨  p_33 ∨ -b^{33, 2}_0
c  in DIMACS:
-15359  15360 -15361  33  15362 0
-15359  15360 -15361  33  15363 0
-15359  15360 -15361  33 -15364 0

c  -2-1 --> break 
c    ( b^{33, 1}_2 ∧  b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧ -p_33) -> break
c  in CNF:
c    -b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨  b^{33, 1}_0 ∨  p_33 ∨ break
c  in DIMACS:
-15359 -15360  15361  33 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 1}_2 ∧ -b^{33, 1}_1 ∧ -b^{33, 1}_0 ∧ true) 
c  in CNF:
c    -b^{33, 1}_2 ∨  b^{33, 1}_1 ∨  b^{33, 1}_0 ∨ false 
c  in DIMACS:
-15359  15360  15361  0

c  3 does not represent an automaton state.
c    -(-b^{33, 1}_2 ∧  b^{33, 1}_1 ∧  b^{33, 1}_0 ∧ true) 
c  in CNF:
c     b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ false 
c  in DIMACS:
 15359 -15360 -15361  0
c  -3 does not represent an automaton state.
c    -( b^{33, 1}_2 ∧  b^{33, 1}_1 ∧  b^{33, 1}_0 ∧ true) 
c  in CNF:
c    -b^{33, 1}_2 ∨ -b^{33, 1}_1 ∨ -b^{33, 1}_0 ∨ false 
c  in DIMACS:
-15359 -15360 -15361  0

c i = 2
c  -2+1 --> -1
c    ( b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧  p_66) -> ( b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0)
c  in CNF:
c    -b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨  b^{33, 3}_2
c    -b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_1
c    -b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨  b^{33, 3}_0
c  in DIMACS:
-15362 -15363  15364 -66  15365 0
-15362 -15363  15364 -66 -15366 0
-15362 -15363  15364 -66  15367 0

c  -1+1 --> 0
c    ( b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0 ∧  p_66) -> (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧ -b^{33, 3}_0)
c  in CNF:
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_2
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_1
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_0
c  in DIMACS:
-15362  15363 -15364 -66 -15365 0
-15362  15363 -15364 -66 -15366 0
-15362  15363 -15364 -66 -15367 0

c  0+1 --> 1
c    (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧  p_66) -> (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0)
c  in CNF:
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_2
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_1
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨  b^{33, 3}_0
c  in DIMACS:
 15362  15363  15364 -66 -15365 0
 15362  15363  15364 -66 -15366 0
 15362  15363  15364 -66  15367 0

c  1+1 --> 2
c    (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0 ∧  p_66) -> (-b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0)
c  in CNF:
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_2
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨  b^{33, 3}_1
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ -p_66 ∨ -b^{33, 3}_0
c  in DIMACS:
 15362  15363 -15364 -66 -15365 0
 15362  15363 -15364 -66  15366 0
 15362  15363 -15364 -66 -15367 0

c  2+1 --> break 
c    (-b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧  p_66) -> break
c  in CNF:
c     b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 15362 -15363  15364 -66 1162 0


c  2-1 --> 1
c    (-b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧ -p_66) -> (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0)
c  in CNF:
c     b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_2
c     b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_1
c     b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨  b^{33, 3}_0
c  in DIMACS:
 15362 -15363  15364  66 -15365 0
 15362 -15363  15364  66 -15366 0
 15362 -15363  15364  66  15367 0

c  1-1 --> 0
c    (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0 ∧ -p_66) -> (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧ -b^{33, 3}_0)
c  in CNF:
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_2
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_1
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_0
c  in DIMACS:
 15362  15363 -15364  66 -15365 0
 15362  15363 -15364  66 -15366 0
 15362  15363 -15364  66 -15367 0

c  0-1 --> -1
c    (-b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧ -p_66) -> ( b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0)
c  in CNF:
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨  b^{33, 3}_2
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_1
c     b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨  b^{33, 3}_0
c  in DIMACS:
 15362  15363  15364  66  15365 0
 15362  15363  15364  66 -15366 0
 15362  15363  15364  66  15367 0

c  -1-1 --> -2
c    ( b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧  b^{33, 2}_0 ∧ -p_66) -> ( b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0)
c  in CNF:
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨  b^{33, 3}_2
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨  b^{33, 3}_1
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨  p_66 ∨ -b^{33, 3}_0
c  in DIMACS:
-15362  15363 -15364  66  15365 0
-15362  15363 -15364  66  15366 0
-15362  15363 -15364  66 -15367 0

c  -2-1 --> break 
c    ( b^{33, 2}_2 ∧  b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨  b^{33, 2}_0 ∨  p_66 ∨ break
c  in DIMACS:
-15362 -15363  15364  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 2}_2 ∧ -b^{33, 2}_1 ∧ -b^{33, 2}_0 ∧ true) 
c  in CNF:
c    -b^{33, 2}_2 ∨  b^{33, 2}_1 ∨  b^{33, 2}_0 ∨ false 
c  in DIMACS:
-15362  15363  15364  0

c  3 does not represent an automaton state.
c    -(-b^{33, 2}_2 ∧  b^{33, 2}_1 ∧  b^{33, 2}_0 ∧ true) 
c  in CNF:
c     b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ false 
c  in DIMACS:
 15362 -15363 -15364  0
c  -3 does not represent an automaton state.
c    -( b^{33, 2}_2 ∧  b^{33, 2}_1 ∧  b^{33, 2}_0 ∧ true) 
c  in CNF:
c    -b^{33, 2}_2 ∨ -b^{33, 2}_1 ∨ -b^{33, 2}_0 ∨ false 
c  in DIMACS:
-15362 -15363 -15364  0

c i = 3
c  -2+1 --> -1
c    ( b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧  p_99) -> ( b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0)
c  in CNF:
c    -b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨  b^{33, 4}_2
c    -b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_1
c    -b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨  b^{33, 4}_0
c  in DIMACS:
-15365 -15366  15367 -99  15368 0
-15365 -15366  15367 -99 -15369 0
-15365 -15366  15367 -99  15370 0

c  -1+1 --> 0
c    ( b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0 ∧  p_99) -> (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧ -b^{33, 4}_0)
c  in CNF:
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_2
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_1
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_0
c  in DIMACS:
-15365  15366 -15367 -99 -15368 0
-15365  15366 -15367 -99 -15369 0
-15365  15366 -15367 -99 -15370 0

c  0+1 --> 1
c    (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧  p_99) -> (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0)
c  in CNF:
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_2
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_1
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨  b^{33, 4}_0
c  in DIMACS:
 15365  15366  15367 -99 -15368 0
 15365  15366  15367 -99 -15369 0
 15365  15366  15367 -99  15370 0

c  1+1 --> 2
c    (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0 ∧  p_99) -> (-b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0)
c  in CNF:
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_2
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨  b^{33, 4}_1
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ -p_99 ∨ -b^{33, 4}_0
c  in DIMACS:
 15365  15366 -15367 -99 -15368 0
 15365  15366 -15367 -99  15369 0
 15365  15366 -15367 -99 -15370 0

c  2+1 --> break 
c    (-b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧  p_99) -> break
c  in CNF:
c     b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 15365 -15366  15367 -99 1162 0


c  2-1 --> 1
c    (-b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧ -p_99) -> (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0)
c  in CNF:
c     b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_2
c     b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_1
c     b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨  b^{33, 4}_0
c  in DIMACS:
 15365 -15366  15367  99 -15368 0
 15365 -15366  15367  99 -15369 0
 15365 -15366  15367  99  15370 0

c  1-1 --> 0
c    (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0 ∧ -p_99) -> (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧ -b^{33, 4}_0)
c  in CNF:
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_2
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_1
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_0
c  in DIMACS:
 15365  15366 -15367  99 -15368 0
 15365  15366 -15367  99 -15369 0
 15365  15366 -15367  99 -15370 0

c  0-1 --> -1
c    (-b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧ -p_99) -> ( b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0)
c  in CNF:
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨  b^{33, 4}_2
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_1
c     b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨  b^{33, 4}_0
c  in DIMACS:
 15365  15366  15367  99  15368 0
 15365  15366  15367  99 -15369 0
 15365  15366  15367  99  15370 0

c  -1-1 --> -2
c    ( b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧  b^{33, 3}_0 ∧ -p_99) -> ( b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0)
c  in CNF:
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨  b^{33, 4}_2
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨  b^{33, 4}_1
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨  p_99 ∨ -b^{33, 4}_0
c  in DIMACS:
-15365  15366 -15367  99  15368 0
-15365  15366 -15367  99  15369 0
-15365  15366 -15367  99 -15370 0

c  -2-1 --> break 
c    ( b^{33, 3}_2 ∧  b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨  b^{33, 3}_0 ∨  p_99 ∨ break
c  in DIMACS:
-15365 -15366  15367  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 3}_2 ∧ -b^{33, 3}_1 ∧ -b^{33, 3}_0 ∧ true) 
c  in CNF:
c    -b^{33, 3}_2 ∨  b^{33, 3}_1 ∨  b^{33, 3}_0 ∨ false 
c  in DIMACS:
-15365  15366  15367  0

c  3 does not represent an automaton state.
c    -(-b^{33, 3}_2 ∧  b^{33, 3}_1 ∧  b^{33, 3}_0 ∧ true) 
c  in CNF:
c     b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ false 
c  in DIMACS:
 15365 -15366 -15367  0
c  -3 does not represent an automaton state.
c    -( b^{33, 3}_2 ∧  b^{33, 3}_1 ∧  b^{33, 3}_0 ∧ true) 
c  in CNF:
c    -b^{33, 3}_2 ∨ -b^{33, 3}_1 ∨ -b^{33, 3}_0 ∨ false 
c  in DIMACS:
-15365 -15366 -15367  0

c i = 4
c  -2+1 --> -1
c    ( b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧  p_132) -> ( b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0)
c  in CNF:
c    -b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨  b^{33, 5}_2
c    -b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_1
c    -b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨  b^{33, 5}_0
c  in DIMACS:
-15368 -15369  15370 -132  15371 0
-15368 -15369  15370 -132 -15372 0
-15368 -15369  15370 -132  15373 0

c  -1+1 --> 0
c    ( b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0 ∧  p_132) -> (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧ -b^{33, 5}_0)
c  in CNF:
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_2
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_1
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_0
c  in DIMACS:
-15368  15369 -15370 -132 -15371 0
-15368  15369 -15370 -132 -15372 0
-15368  15369 -15370 -132 -15373 0

c  0+1 --> 1
c    (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧  p_132) -> (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0)
c  in CNF:
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_2
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_1
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨  b^{33, 5}_0
c  in DIMACS:
 15368  15369  15370 -132 -15371 0
 15368  15369  15370 -132 -15372 0
 15368  15369  15370 -132  15373 0

c  1+1 --> 2
c    (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0 ∧  p_132) -> (-b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0)
c  in CNF:
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_2
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨  b^{33, 5}_1
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ -p_132 ∨ -b^{33, 5}_0
c  in DIMACS:
 15368  15369 -15370 -132 -15371 0
 15368  15369 -15370 -132  15372 0
 15368  15369 -15370 -132 -15373 0

c  2+1 --> break 
c    (-b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧  p_132) -> break
c  in CNF:
c     b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 15368 -15369  15370 -132 1162 0


c  2-1 --> 1
c    (-b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧ -p_132) -> (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0)
c  in CNF:
c     b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_2
c     b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_1
c     b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨  b^{33, 5}_0
c  in DIMACS:
 15368 -15369  15370  132 -15371 0
 15368 -15369  15370  132 -15372 0
 15368 -15369  15370  132  15373 0

c  1-1 --> 0
c    (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0 ∧ -p_132) -> (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧ -b^{33, 5}_0)
c  in CNF:
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_2
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_1
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_0
c  in DIMACS:
 15368  15369 -15370  132 -15371 0
 15368  15369 -15370  132 -15372 0
 15368  15369 -15370  132 -15373 0

c  0-1 --> -1
c    (-b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧ -p_132) -> ( b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0)
c  in CNF:
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨  b^{33, 5}_2
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_1
c     b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨  b^{33, 5}_0
c  in DIMACS:
 15368  15369  15370  132  15371 0
 15368  15369  15370  132 -15372 0
 15368  15369  15370  132  15373 0

c  -1-1 --> -2
c    ( b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧  b^{33, 4}_0 ∧ -p_132) -> ( b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0)
c  in CNF:
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨  b^{33, 5}_2
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨  b^{33, 5}_1
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨  p_132 ∨ -b^{33, 5}_0
c  in DIMACS:
-15368  15369 -15370  132  15371 0
-15368  15369 -15370  132  15372 0
-15368  15369 -15370  132 -15373 0

c  -2-1 --> break 
c    ( b^{33, 4}_2 ∧  b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨  b^{33, 4}_0 ∨  p_132 ∨ break
c  in DIMACS:
-15368 -15369  15370  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 4}_2 ∧ -b^{33, 4}_1 ∧ -b^{33, 4}_0 ∧ true) 
c  in CNF:
c    -b^{33, 4}_2 ∨  b^{33, 4}_1 ∨  b^{33, 4}_0 ∨ false 
c  in DIMACS:
-15368  15369  15370  0

c  3 does not represent an automaton state.
c    -(-b^{33, 4}_2 ∧  b^{33, 4}_1 ∧  b^{33, 4}_0 ∧ true) 
c  in CNF:
c     b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ false 
c  in DIMACS:
 15368 -15369 -15370  0
c  -3 does not represent an automaton state.
c    -( b^{33, 4}_2 ∧  b^{33, 4}_1 ∧  b^{33, 4}_0 ∧ true) 
c  in CNF:
c    -b^{33, 4}_2 ∨ -b^{33, 4}_1 ∨ -b^{33, 4}_0 ∨ false 
c  in DIMACS:
-15368 -15369 -15370  0

c i = 5
c  -2+1 --> -1
c    ( b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧  p_165) -> ( b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0)
c  in CNF:
c    -b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨  b^{33, 6}_2
c    -b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_1
c    -b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨  b^{33, 6}_0
c  in DIMACS:
-15371 -15372  15373 -165  15374 0
-15371 -15372  15373 -165 -15375 0
-15371 -15372  15373 -165  15376 0

c  -1+1 --> 0
c    ( b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0 ∧  p_165) -> (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧ -b^{33, 6}_0)
c  in CNF:
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_2
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_1
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_0
c  in DIMACS:
-15371  15372 -15373 -165 -15374 0
-15371  15372 -15373 -165 -15375 0
-15371  15372 -15373 -165 -15376 0

c  0+1 --> 1
c    (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧  p_165) -> (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0)
c  in CNF:
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_2
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_1
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨  b^{33, 6}_0
c  in DIMACS:
 15371  15372  15373 -165 -15374 0
 15371  15372  15373 -165 -15375 0
 15371  15372  15373 -165  15376 0

c  1+1 --> 2
c    (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0 ∧  p_165) -> (-b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0)
c  in CNF:
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_2
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨  b^{33, 6}_1
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ -p_165 ∨ -b^{33, 6}_0
c  in DIMACS:
 15371  15372 -15373 -165 -15374 0
 15371  15372 -15373 -165  15375 0
 15371  15372 -15373 -165 -15376 0

c  2+1 --> break 
c    (-b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧  p_165) -> break
c  in CNF:
c     b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 15371 -15372  15373 -165 1162 0


c  2-1 --> 1
c    (-b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧ -p_165) -> (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0)
c  in CNF:
c     b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_2
c     b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_1
c     b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨  b^{33, 6}_0
c  in DIMACS:
 15371 -15372  15373  165 -15374 0
 15371 -15372  15373  165 -15375 0
 15371 -15372  15373  165  15376 0

c  1-1 --> 0
c    (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0 ∧ -p_165) -> (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧ -b^{33, 6}_0)
c  in CNF:
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_2
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_1
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_0
c  in DIMACS:
 15371  15372 -15373  165 -15374 0
 15371  15372 -15373  165 -15375 0
 15371  15372 -15373  165 -15376 0

c  0-1 --> -1
c    (-b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧ -p_165) -> ( b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0)
c  in CNF:
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨  b^{33, 6}_2
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_1
c     b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨  b^{33, 6}_0
c  in DIMACS:
 15371  15372  15373  165  15374 0
 15371  15372  15373  165 -15375 0
 15371  15372  15373  165  15376 0

c  -1-1 --> -2
c    ( b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧  b^{33, 5}_0 ∧ -p_165) -> ( b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0)
c  in CNF:
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨  b^{33, 6}_2
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨  b^{33, 6}_1
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨  p_165 ∨ -b^{33, 6}_0
c  in DIMACS:
-15371  15372 -15373  165  15374 0
-15371  15372 -15373  165  15375 0
-15371  15372 -15373  165 -15376 0

c  -2-1 --> break 
c    ( b^{33, 5}_2 ∧  b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨  b^{33, 5}_0 ∨  p_165 ∨ break
c  in DIMACS:
-15371 -15372  15373  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 5}_2 ∧ -b^{33, 5}_1 ∧ -b^{33, 5}_0 ∧ true) 
c  in CNF:
c    -b^{33, 5}_2 ∨  b^{33, 5}_1 ∨  b^{33, 5}_0 ∨ false 
c  in DIMACS:
-15371  15372  15373  0

c  3 does not represent an automaton state.
c    -(-b^{33, 5}_2 ∧  b^{33, 5}_1 ∧  b^{33, 5}_0 ∧ true) 
c  in CNF:
c     b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ false 
c  in DIMACS:
 15371 -15372 -15373  0
c  -3 does not represent an automaton state.
c    -( b^{33, 5}_2 ∧  b^{33, 5}_1 ∧  b^{33, 5}_0 ∧ true) 
c  in CNF:
c    -b^{33, 5}_2 ∨ -b^{33, 5}_1 ∨ -b^{33, 5}_0 ∨ false 
c  in DIMACS:
-15371 -15372 -15373  0

c i = 6
c  -2+1 --> -1
c    ( b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧  p_198) -> ( b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0)
c  in CNF:
c    -b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨  b^{33, 7}_2
c    -b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_1
c    -b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨  b^{33, 7}_0
c  in DIMACS:
-15374 -15375  15376 -198  15377 0
-15374 -15375  15376 -198 -15378 0
-15374 -15375  15376 -198  15379 0

c  -1+1 --> 0
c    ( b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0 ∧  p_198) -> (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧ -b^{33, 7}_0)
c  in CNF:
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_2
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_1
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_0
c  in DIMACS:
-15374  15375 -15376 -198 -15377 0
-15374  15375 -15376 -198 -15378 0
-15374  15375 -15376 -198 -15379 0

c  0+1 --> 1
c    (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧  p_198) -> (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0)
c  in CNF:
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_2
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_1
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨  b^{33, 7}_0
c  in DIMACS:
 15374  15375  15376 -198 -15377 0
 15374  15375  15376 -198 -15378 0
 15374  15375  15376 -198  15379 0

c  1+1 --> 2
c    (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0 ∧  p_198) -> (-b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0)
c  in CNF:
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_2
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨  b^{33, 7}_1
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ -p_198 ∨ -b^{33, 7}_0
c  in DIMACS:
 15374  15375 -15376 -198 -15377 0
 15374  15375 -15376 -198  15378 0
 15374  15375 -15376 -198 -15379 0

c  2+1 --> break 
c    (-b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧  p_198) -> break
c  in CNF:
c     b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 15374 -15375  15376 -198 1162 0


c  2-1 --> 1
c    (-b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧ -p_198) -> (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0)
c  in CNF:
c     b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_2
c     b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_1
c     b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨  b^{33, 7}_0
c  in DIMACS:
 15374 -15375  15376  198 -15377 0
 15374 -15375  15376  198 -15378 0
 15374 -15375  15376  198  15379 0

c  1-1 --> 0
c    (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0 ∧ -p_198) -> (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧ -b^{33, 7}_0)
c  in CNF:
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_2
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_1
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_0
c  in DIMACS:
 15374  15375 -15376  198 -15377 0
 15374  15375 -15376  198 -15378 0
 15374  15375 -15376  198 -15379 0

c  0-1 --> -1
c    (-b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧ -p_198) -> ( b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0)
c  in CNF:
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨  b^{33, 7}_2
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_1
c     b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨  b^{33, 7}_0
c  in DIMACS:
 15374  15375  15376  198  15377 0
 15374  15375  15376  198 -15378 0
 15374  15375  15376  198  15379 0

c  -1-1 --> -2
c    ( b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧  b^{33, 6}_0 ∧ -p_198) -> ( b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0)
c  in CNF:
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨  b^{33, 7}_2
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨  b^{33, 7}_1
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨  p_198 ∨ -b^{33, 7}_0
c  in DIMACS:
-15374  15375 -15376  198  15377 0
-15374  15375 -15376  198  15378 0
-15374  15375 -15376  198 -15379 0

c  -2-1 --> break 
c    ( b^{33, 6}_2 ∧  b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨  b^{33, 6}_0 ∨  p_198 ∨ break
c  in DIMACS:
-15374 -15375  15376  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 6}_2 ∧ -b^{33, 6}_1 ∧ -b^{33, 6}_0 ∧ true) 
c  in CNF:
c    -b^{33, 6}_2 ∨  b^{33, 6}_1 ∨  b^{33, 6}_0 ∨ false 
c  in DIMACS:
-15374  15375  15376  0

c  3 does not represent an automaton state.
c    -(-b^{33, 6}_2 ∧  b^{33, 6}_1 ∧  b^{33, 6}_0 ∧ true) 
c  in CNF:
c     b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ false 
c  in DIMACS:
 15374 -15375 -15376  0
c  -3 does not represent an automaton state.
c    -( b^{33, 6}_2 ∧  b^{33, 6}_1 ∧  b^{33, 6}_0 ∧ true) 
c  in CNF:
c    -b^{33, 6}_2 ∨ -b^{33, 6}_1 ∨ -b^{33, 6}_0 ∨ false 
c  in DIMACS:
-15374 -15375 -15376  0

c i = 7
c  -2+1 --> -1
c    ( b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧  p_231) -> ( b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0)
c  in CNF:
c    -b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨  b^{33, 8}_2
c    -b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_1
c    -b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨  b^{33, 8}_0
c  in DIMACS:
-15377 -15378  15379 -231  15380 0
-15377 -15378  15379 -231 -15381 0
-15377 -15378  15379 -231  15382 0

c  -1+1 --> 0
c    ( b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0 ∧  p_231) -> (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧ -b^{33, 8}_0)
c  in CNF:
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_2
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_1
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_0
c  in DIMACS:
-15377  15378 -15379 -231 -15380 0
-15377  15378 -15379 -231 -15381 0
-15377  15378 -15379 -231 -15382 0

c  0+1 --> 1
c    (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧  p_231) -> (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0)
c  in CNF:
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_2
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_1
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨  b^{33, 8}_0
c  in DIMACS:
 15377  15378  15379 -231 -15380 0
 15377  15378  15379 -231 -15381 0
 15377  15378  15379 -231  15382 0

c  1+1 --> 2
c    (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0 ∧  p_231) -> (-b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0)
c  in CNF:
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_2
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨  b^{33, 8}_1
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ -p_231 ∨ -b^{33, 8}_0
c  in DIMACS:
 15377  15378 -15379 -231 -15380 0
 15377  15378 -15379 -231  15381 0
 15377  15378 -15379 -231 -15382 0

c  2+1 --> break 
c    (-b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧  p_231) -> break
c  in CNF:
c     b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 15377 -15378  15379 -231 1162 0


c  2-1 --> 1
c    (-b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧ -p_231) -> (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0)
c  in CNF:
c     b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_2
c     b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_1
c     b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨  b^{33, 8}_0
c  in DIMACS:
 15377 -15378  15379  231 -15380 0
 15377 -15378  15379  231 -15381 0
 15377 -15378  15379  231  15382 0

c  1-1 --> 0
c    (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0 ∧ -p_231) -> (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧ -b^{33, 8}_0)
c  in CNF:
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_2
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_1
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_0
c  in DIMACS:
 15377  15378 -15379  231 -15380 0
 15377  15378 -15379  231 -15381 0
 15377  15378 -15379  231 -15382 0

c  0-1 --> -1
c    (-b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧ -p_231) -> ( b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0)
c  in CNF:
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨  b^{33, 8}_2
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_1
c     b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨  b^{33, 8}_0
c  in DIMACS:
 15377  15378  15379  231  15380 0
 15377  15378  15379  231 -15381 0
 15377  15378  15379  231  15382 0

c  -1-1 --> -2
c    ( b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧  b^{33, 7}_0 ∧ -p_231) -> ( b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0)
c  in CNF:
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨  b^{33, 8}_2
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨  b^{33, 8}_1
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨  p_231 ∨ -b^{33, 8}_0
c  in DIMACS:
-15377  15378 -15379  231  15380 0
-15377  15378 -15379  231  15381 0
-15377  15378 -15379  231 -15382 0

c  -2-1 --> break 
c    ( b^{33, 7}_2 ∧  b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨  b^{33, 7}_0 ∨  p_231 ∨ break
c  in DIMACS:
-15377 -15378  15379  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 7}_2 ∧ -b^{33, 7}_1 ∧ -b^{33, 7}_0 ∧ true) 
c  in CNF:
c    -b^{33, 7}_2 ∨  b^{33, 7}_1 ∨  b^{33, 7}_0 ∨ false 
c  in DIMACS:
-15377  15378  15379  0

c  3 does not represent an automaton state.
c    -(-b^{33, 7}_2 ∧  b^{33, 7}_1 ∧  b^{33, 7}_0 ∧ true) 
c  in CNF:
c     b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ false 
c  in DIMACS:
 15377 -15378 -15379  0
c  -3 does not represent an automaton state.
c    -( b^{33, 7}_2 ∧  b^{33, 7}_1 ∧  b^{33, 7}_0 ∧ true) 
c  in CNF:
c    -b^{33, 7}_2 ∨ -b^{33, 7}_1 ∨ -b^{33, 7}_0 ∨ false 
c  in DIMACS:
-15377 -15378 -15379  0

c i = 8
c  -2+1 --> -1
c    ( b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧  p_264) -> ( b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0)
c  in CNF:
c    -b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨  b^{33, 9}_2
c    -b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_1
c    -b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨  b^{33, 9}_0
c  in DIMACS:
-15380 -15381  15382 -264  15383 0
-15380 -15381  15382 -264 -15384 0
-15380 -15381  15382 -264  15385 0

c  -1+1 --> 0
c    ( b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0 ∧  p_264) -> (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧ -b^{33, 9}_0)
c  in CNF:
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_2
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_1
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_0
c  in DIMACS:
-15380  15381 -15382 -264 -15383 0
-15380  15381 -15382 -264 -15384 0
-15380  15381 -15382 -264 -15385 0

c  0+1 --> 1
c    (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧  p_264) -> (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0)
c  in CNF:
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_2
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_1
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨  b^{33, 9}_0
c  in DIMACS:
 15380  15381  15382 -264 -15383 0
 15380  15381  15382 -264 -15384 0
 15380  15381  15382 -264  15385 0

c  1+1 --> 2
c    (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0 ∧  p_264) -> (-b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0)
c  in CNF:
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_2
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨  b^{33, 9}_1
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ -p_264 ∨ -b^{33, 9}_0
c  in DIMACS:
 15380  15381 -15382 -264 -15383 0
 15380  15381 -15382 -264  15384 0
 15380  15381 -15382 -264 -15385 0

c  2+1 --> break 
c    (-b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧  p_264) -> break
c  in CNF:
c     b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 15380 -15381  15382 -264 1162 0


c  2-1 --> 1
c    (-b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧ -p_264) -> (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0)
c  in CNF:
c     b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_2
c     b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_1
c     b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨  b^{33, 9}_0
c  in DIMACS:
 15380 -15381  15382  264 -15383 0
 15380 -15381  15382  264 -15384 0
 15380 -15381  15382  264  15385 0

c  1-1 --> 0
c    (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0 ∧ -p_264) -> (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧ -b^{33, 9}_0)
c  in CNF:
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_2
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_1
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_0
c  in DIMACS:
 15380  15381 -15382  264 -15383 0
 15380  15381 -15382  264 -15384 0
 15380  15381 -15382  264 -15385 0

c  0-1 --> -1
c    (-b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧ -p_264) -> ( b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0)
c  in CNF:
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨  b^{33, 9}_2
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_1
c     b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨  b^{33, 9}_0
c  in DIMACS:
 15380  15381  15382  264  15383 0
 15380  15381  15382  264 -15384 0
 15380  15381  15382  264  15385 0

c  -1-1 --> -2
c    ( b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧  b^{33, 8}_0 ∧ -p_264) -> ( b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0)
c  in CNF:
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨  b^{33, 9}_2
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨  b^{33, 9}_1
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨  p_264 ∨ -b^{33, 9}_0
c  in DIMACS:
-15380  15381 -15382  264  15383 0
-15380  15381 -15382  264  15384 0
-15380  15381 -15382  264 -15385 0

c  -2-1 --> break 
c    ( b^{33, 8}_2 ∧  b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨  b^{33, 8}_0 ∨  p_264 ∨ break
c  in DIMACS:
-15380 -15381  15382  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 8}_2 ∧ -b^{33, 8}_1 ∧ -b^{33, 8}_0 ∧ true) 
c  in CNF:
c    -b^{33, 8}_2 ∨  b^{33, 8}_1 ∨  b^{33, 8}_0 ∨ false 
c  in DIMACS:
-15380  15381  15382  0

c  3 does not represent an automaton state.
c    -(-b^{33, 8}_2 ∧  b^{33, 8}_1 ∧  b^{33, 8}_0 ∧ true) 
c  in CNF:
c     b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ false 
c  in DIMACS:
 15380 -15381 -15382  0
c  -3 does not represent an automaton state.
c    -( b^{33, 8}_2 ∧  b^{33, 8}_1 ∧  b^{33, 8}_0 ∧ true) 
c  in CNF:
c    -b^{33, 8}_2 ∨ -b^{33, 8}_1 ∨ -b^{33, 8}_0 ∨ false 
c  in DIMACS:
-15380 -15381 -15382  0

c i = 9
c  -2+1 --> -1
c    ( b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧  p_297) -> ( b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0)
c  in CNF:
c    -b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨  b^{33, 10}_2
c    -b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_1
c    -b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨  b^{33, 10}_0
c  in DIMACS:
-15383 -15384  15385 -297  15386 0
-15383 -15384  15385 -297 -15387 0
-15383 -15384  15385 -297  15388 0

c  -1+1 --> 0
c    ( b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0 ∧  p_297) -> (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧ -b^{33, 10}_0)
c  in CNF:
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_2
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_1
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_0
c  in DIMACS:
-15383  15384 -15385 -297 -15386 0
-15383  15384 -15385 -297 -15387 0
-15383  15384 -15385 -297 -15388 0

c  0+1 --> 1
c    (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧  p_297) -> (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0)
c  in CNF:
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_2
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_1
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨  b^{33, 10}_0
c  in DIMACS:
 15383  15384  15385 -297 -15386 0
 15383  15384  15385 -297 -15387 0
 15383  15384  15385 -297  15388 0

c  1+1 --> 2
c    (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0 ∧  p_297) -> (-b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0)
c  in CNF:
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_2
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨  b^{33, 10}_1
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ -p_297 ∨ -b^{33, 10}_0
c  in DIMACS:
 15383  15384 -15385 -297 -15386 0
 15383  15384 -15385 -297  15387 0
 15383  15384 -15385 -297 -15388 0

c  2+1 --> break 
c    (-b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧  p_297) -> break
c  in CNF:
c     b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 15383 -15384  15385 -297 1162 0


c  2-1 --> 1
c    (-b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧ -p_297) -> (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0)
c  in CNF:
c     b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_2
c     b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_1
c     b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨  b^{33, 10}_0
c  in DIMACS:
 15383 -15384  15385  297 -15386 0
 15383 -15384  15385  297 -15387 0
 15383 -15384  15385  297  15388 0

c  1-1 --> 0
c    (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0 ∧ -p_297) -> (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧ -b^{33, 10}_0)
c  in CNF:
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_2
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_1
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_0
c  in DIMACS:
 15383  15384 -15385  297 -15386 0
 15383  15384 -15385  297 -15387 0
 15383  15384 -15385  297 -15388 0

c  0-1 --> -1
c    (-b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧ -p_297) -> ( b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0)
c  in CNF:
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨  b^{33, 10}_2
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_1
c     b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨  b^{33, 10}_0
c  in DIMACS:
 15383  15384  15385  297  15386 0
 15383  15384  15385  297 -15387 0
 15383  15384  15385  297  15388 0

c  -1-1 --> -2
c    ( b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧  b^{33, 9}_0 ∧ -p_297) -> ( b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0)
c  in CNF:
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨  b^{33, 10}_2
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨  b^{33, 10}_1
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨  p_297 ∨ -b^{33, 10}_0
c  in DIMACS:
-15383  15384 -15385  297  15386 0
-15383  15384 -15385  297  15387 0
-15383  15384 -15385  297 -15388 0

c  -2-1 --> break 
c    ( b^{33, 9}_2 ∧  b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨  b^{33, 9}_0 ∨  p_297 ∨ break
c  in DIMACS:
-15383 -15384  15385  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 9}_2 ∧ -b^{33, 9}_1 ∧ -b^{33, 9}_0 ∧ true) 
c  in CNF:
c    -b^{33, 9}_2 ∨  b^{33, 9}_1 ∨  b^{33, 9}_0 ∨ false 
c  in DIMACS:
-15383  15384  15385  0

c  3 does not represent an automaton state.
c    -(-b^{33, 9}_2 ∧  b^{33, 9}_1 ∧  b^{33, 9}_0 ∧ true) 
c  in CNF:
c     b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ false 
c  in DIMACS:
 15383 -15384 -15385  0
c  -3 does not represent an automaton state.
c    -( b^{33, 9}_2 ∧  b^{33, 9}_1 ∧  b^{33, 9}_0 ∧ true) 
c  in CNF:
c    -b^{33, 9}_2 ∨ -b^{33, 9}_1 ∨ -b^{33, 9}_0 ∨ false 
c  in DIMACS:
-15383 -15384 -15385  0

c i = 10
c  -2+1 --> -1
c    ( b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧  p_330) -> ( b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0)
c  in CNF:
c    -b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨  b^{33, 11}_2
c    -b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_1
c    -b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨  b^{33, 11}_0
c  in DIMACS:
-15386 -15387  15388 -330  15389 0
-15386 -15387  15388 -330 -15390 0
-15386 -15387  15388 -330  15391 0

c  -1+1 --> 0
c    ( b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0 ∧  p_330) -> (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧ -b^{33, 11}_0)
c  in CNF:
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_2
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_1
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_0
c  in DIMACS:
-15386  15387 -15388 -330 -15389 0
-15386  15387 -15388 -330 -15390 0
-15386  15387 -15388 -330 -15391 0

c  0+1 --> 1
c    (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧  p_330) -> (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0)
c  in CNF:
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_2
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_1
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨  b^{33, 11}_0
c  in DIMACS:
 15386  15387  15388 -330 -15389 0
 15386  15387  15388 -330 -15390 0
 15386  15387  15388 -330  15391 0

c  1+1 --> 2
c    (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0 ∧  p_330) -> (-b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0)
c  in CNF:
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_2
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨  b^{33, 11}_1
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ -p_330 ∨ -b^{33, 11}_0
c  in DIMACS:
 15386  15387 -15388 -330 -15389 0
 15386  15387 -15388 -330  15390 0
 15386  15387 -15388 -330 -15391 0

c  2+1 --> break 
c    (-b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧  p_330) -> break
c  in CNF:
c     b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 15386 -15387  15388 -330 1162 0


c  2-1 --> 1
c    (-b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧ -p_330) -> (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0)
c  in CNF:
c     b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_2
c     b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_1
c     b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨  b^{33, 11}_0
c  in DIMACS:
 15386 -15387  15388  330 -15389 0
 15386 -15387  15388  330 -15390 0
 15386 -15387  15388  330  15391 0

c  1-1 --> 0
c    (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0 ∧ -p_330) -> (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧ -b^{33, 11}_0)
c  in CNF:
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_2
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_1
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_0
c  in DIMACS:
 15386  15387 -15388  330 -15389 0
 15386  15387 -15388  330 -15390 0
 15386  15387 -15388  330 -15391 0

c  0-1 --> -1
c    (-b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧ -p_330) -> ( b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0)
c  in CNF:
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨  b^{33, 11}_2
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_1
c     b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨  b^{33, 11}_0
c  in DIMACS:
 15386  15387  15388  330  15389 0
 15386  15387  15388  330 -15390 0
 15386  15387  15388  330  15391 0

c  -1-1 --> -2
c    ( b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧  b^{33, 10}_0 ∧ -p_330) -> ( b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0)
c  in CNF:
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨  b^{33, 11}_2
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨  b^{33, 11}_1
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨  p_330 ∨ -b^{33, 11}_0
c  in DIMACS:
-15386  15387 -15388  330  15389 0
-15386  15387 -15388  330  15390 0
-15386  15387 -15388  330 -15391 0

c  -2-1 --> break 
c    ( b^{33, 10}_2 ∧  b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨  b^{33, 10}_0 ∨  p_330 ∨ break
c  in DIMACS:
-15386 -15387  15388  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 10}_2 ∧ -b^{33, 10}_1 ∧ -b^{33, 10}_0 ∧ true) 
c  in CNF:
c    -b^{33, 10}_2 ∨  b^{33, 10}_1 ∨  b^{33, 10}_0 ∨ false 
c  in DIMACS:
-15386  15387  15388  0

c  3 does not represent an automaton state.
c    -(-b^{33, 10}_2 ∧  b^{33, 10}_1 ∧  b^{33, 10}_0 ∧ true) 
c  in CNF:
c     b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ false 
c  in DIMACS:
 15386 -15387 -15388  0
c  -3 does not represent an automaton state.
c    -( b^{33, 10}_2 ∧  b^{33, 10}_1 ∧  b^{33, 10}_0 ∧ true) 
c  in CNF:
c    -b^{33, 10}_2 ∨ -b^{33, 10}_1 ∨ -b^{33, 10}_0 ∨ false 
c  in DIMACS:
-15386 -15387 -15388  0

c i = 11
c  -2+1 --> -1
c    ( b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧  p_363) -> ( b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0)
c  in CNF:
c    -b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨  b^{33, 12}_2
c    -b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_1
c    -b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨  b^{33, 12}_0
c  in DIMACS:
-15389 -15390  15391 -363  15392 0
-15389 -15390  15391 -363 -15393 0
-15389 -15390  15391 -363  15394 0

c  -1+1 --> 0
c    ( b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0 ∧  p_363) -> (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧ -b^{33, 12}_0)
c  in CNF:
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_2
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_1
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_0
c  in DIMACS:
-15389  15390 -15391 -363 -15392 0
-15389  15390 -15391 -363 -15393 0
-15389  15390 -15391 -363 -15394 0

c  0+1 --> 1
c    (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧  p_363) -> (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0)
c  in CNF:
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_2
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_1
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨  b^{33, 12}_0
c  in DIMACS:
 15389  15390  15391 -363 -15392 0
 15389  15390  15391 -363 -15393 0
 15389  15390  15391 -363  15394 0

c  1+1 --> 2
c    (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0 ∧  p_363) -> (-b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0)
c  in CNF:
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_2
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨  b^{33, 12}_1
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ -p_363 ∨ -b^{33, 12}_0
c  in DIMACS:
 15389  15390 -15391 -363 -15392 0
 15389  15390 -15391 -363  15393 0
 15389  15390 -15391 -363 -15394 0

c  2+1 --> break 
c    (-b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧  p_363) -> break
c  in CNF:
c     b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 15389 -15390  15391 -363 1162 0


c  2-1 --> 1
c    (-b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧ -p_363) -> (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0)
c  in CNF:
c     b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_2
c     b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_1
c     b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨  b^{33, 12}_0
c  in DIMACS:
 15389 -15390  15391  363 -15392 0
 15389 -15390  15391  363 -15393 0
 15389 -15390  15391  363  15394 0

c  1-1 --> 0
c    (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0 ∧ -p_363) -> (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧ -b^{33, 12}_0)
c  in CNF:
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_2
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_1
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_0
c  in DIMACS:
 15389  15390 -15391  363 -15392 0
 15389  15390 -15391  363 -15393 0
 15389  15390 -15391  363 -15394 0

c  0-1 --> -1
c    (-b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧ -p_363) -> ( b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0)
c  in CNF:
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨  b^{33, 12}_2
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_1
c     b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨  b^{33, 12}_0
c  in DIMACS:
 15389  15390  15391  363  15392 0
 15389  15390  15391  363 -15393 0
 15389  15390  15391  363  15394 0

c  -1-1 --> -2
c    ( b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧  b^{33, 11}_0 ∧ -p_363) -> ( b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0)
c  in CNF:
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨  b^{33, 12}_2
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨  b^{33, 12}_1
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨  p_363 ∨ -b^{33, 12}_0
c  in DIMACS:
-15389  15390 -15391  363  15392 0
-15389  15390 -15391  363  15393 0
-15389  15390 -15391  363 -15394 0

c  -2-1 --> break 
c    ( b^{33, 11}_2 ∧  b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨  b^{33, 11}_0 ∨  p_363 ∨ break
c  in DIMACS:
-15389 -15390  15391  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 11}_2 ∧ -b^{33, 11}_1 ∧ -b^{33, 11}_0 ∧ true) 
c  in CNF:
c    -b^{33, 11}_2 ∨  b^{33, 11}_1 ∨  b^{33, 11}_0 ∨ false 
c  in DIMACS:
-15389  15390  15391  0

c  3 does not represent an automaton state.
c    -(-b^{33, 11}_2 ∧  b^{33, 11}_1 ∧  b^{33, 11}_0 ∧ true) 
c  in CNF:
c     b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ false 
c  in DIMACS:
 15389 -15390 -15391  0
c  -3 does not represent an automaton state.
c    -( b^{33, 11}_2 ∧  b^{33, 11}_1 ∧  b^{33, 11}_0 ∧ true) 
c  in CNF:
c    -b^{33, 11}_2 ∨ -b^{33, 11}_1 ∨ -b^{33, 11}_0 ∨ false 
c  in DIMACS:
-15389 -15390 -15391  0

c i = 12
c  -2+1 --> -1
c    ( b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧  p_396) -> ( b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0)
c  in CNF:
c    -b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨  b^{33, 13}_2
c    -b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_1
c    -b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨  b^{33, 13}_0
c  in DIMACS:
-15392 -15393  15394 -396  15395 0
-15392 -15393  15394 -396 -15396 0
-15392 -15393  15394 -396  15397 0

c  -1+1 --> 0
c    ( b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0 ∧  p_396) -> (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧ -b^{33, 13}_0)
c  in CNF:
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_2
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_1
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_0
c  in DIMACS:
-15392  15393 -15394 -396 -15395 0
-15392  15393 -15394 -396 -15396 0
-15392  15393 -15394 -396 -15397 0

c  0+1 --> 1
c    (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧  p_396) -> (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0)
c  in CNF:
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_2
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_1
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨  b^{33, 13}_0
c  in DIMACS:
 15392  15393  15394 -396 -15395 0
 15392  15393  15394 -396 -15396 0
 15392  15393  15394 -396  15397 0

c  1+1 --> 2
c    (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0 ∧  p_396) -> (-b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0)
c  in CNF:
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_2
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨  b^{33, 13}_1
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ -p_396 ∨ -b^{33, 13}_0
c  in DIMACS:
 15392  15393 -15394 -396 -15395 0
 15392  15393 -15394 -396  15396 0
 15392  15393 -15394 -396 -15397 0

c  2+1 --> break 
c    (-b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧  p_396) -> break
c  in CNF:
c     b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 15392 -15393  15394 -396 1162 0


c  2-1 --> 1
c    (-b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧ -p_396) -> (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0)
c  in CNF:
c     b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_2
c     b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_1
c     b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨  b^{33, 13}_0
c  in DIMACS:
 15392 -15393  15394  396 -15395 0
 15392 -15393  15394  396 -15396 0
 15392 -15393  15394  396  15397 0

c  1-1 --> 0
c    (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0 ∧ -p_396) -> (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧ -b^{33, 13}_0)
c  in CNF:
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_2
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_1
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_0
c  in DIMACS:
 15392  15393 -15394  396 -15395 0
 15392  15393 -15394  396 -15396 0
 15392  15393 -15394  396 -15397 0

c  0-1 --> -1
c    (-b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧ -p_396) -> ( b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0)
c  in CNF:
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨  b^{33, 13}_2
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_1
c     b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨  b^{33, 13}_0
c  in DIMACS:
 15392  15393  15394  396  15395 0
 15392  15393  15394  396 -15396 0
 15392  15393  15394  396  15397 0

c  -1-1 --> -2
c    ( b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧  b^{33, 12}_0 ∧ -p_396) -> ( b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0)
c  in CNF:
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨  b^{33, 13}_2
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨  b^{33, 13}_1
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨  p_396 ∨ -b^{33, 13}_0
c  in DIMACS:
-15392  15393 -15394  396  15395 0
-15392  15393 -15394  396  15396 0
-15392  15393 -15394  396 -15397 0

c  -2-1 --> break 
c    ( b^{33, 12}_2 ∧  b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨  b^{33, 12}_0 ∨  p_396 ∨ break
c  in DIMACS:
-15392 -15393  15394  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 12}_2 ∧ -b^{33, 12}_1 ∧ -b^{33, 12}_0 ∧ true) 
c  in CNF:
c    -b^{33, 12}_2 ∨  b^{33, 12}_1 ∨  b^{33, 12}_0 ∨ false 
c  in DIMACS:
-15392  15393  15394  0

c  3 does not represent an automaton state.
c    -(-b^{33, 12}_2 ∧  b^{33, 12}_1 ∧  b^{33, 12}_0 ∧ true) 
c  in CNF:
c     b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ false 
c  in DIMACS:
 15392 -15393 -15394  0
c  -3 does not represent an automaton state.
c    -( b^{33, 12}_2 ∧  b^{33, 12}_1 ∧  b^{33, 12}_0 ∧ true) 
c  in CNF:
c    -b^{33, 12}_2 ∨ -b^{33, 12}_1 ∨ -b^{33, 12}_0 ∨ false 
c  in DIMACS:
-15392 -15393 -15394  0

c i = 13
c  -2+1 --> -1
c    ( b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧  p_429) -> ( b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0)
c  in CNF:
c    -b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨  b^{33, 14}_2
c    -b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_1
c    -b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨  b^{33, 14}_0
c  in DIMACS:
-15395 -15396  15397 -429  15398 0
-15395 -15396  15397 -429 -15399 0
-15395 -15396  15397 -429  15400 0

c  -1+1 --> 0
c    ( b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0 ∧  p_429) -> (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧ -b^{33, 14}_0)
c  in CNF:
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_2
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_1
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_0
c  in DIMACS:
-15395  15396 -15397 -429 -15398 0
-15395  15396 -15397 -429 -15399 0
-15395  15396 -15397 -429 -15400 0

c  0+1 --> 1
c    (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧  p_429) -> (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0)
c  in CNF:
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_2
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_1
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨  b^{33, 14}_0
c  in DIMACS:
 15395  15396  15397 -429 -15398 0
 15395  15396  15397 -429 -15399 0
 15395  15396  15397 -429  15400 0

c  1+1 --> 2
c    (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0 ∧  p_429) -> (-b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0)
c  in CNF:
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_2
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨  b^{33, 14}_1
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ -p_429 ∨ -b^{33, 14}_0
c  in DIMACS:
 15395  15396 -15397 -429 -15398 0
 15395  15396 -15397 -429  15399 0
 15395  15396 -15397 -429 -15400 0

c  2+1 --> break 
c    (-b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧  p_429) -> break
c  in CNF:
c     b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 15395 -15396  15397 -429 1162 0


c  2-1 --> 1
c    (-b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧ -p_429) -> (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0)
c  in CNF:
c     b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_2
c     b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_1
c     b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨  b^{33, 14}_0
c  in DIMACS:
 15395 -15396  15397  429 -15398 0
 15395 -15396  15397  429 -15399 0
 15395 -15396  15397  429  15400 0

c  1-1 --> 0
c    (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0 ∧ -p_429) -> (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧ -b^{33, 14}_0)
c  in CNF:
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_2
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_1
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_0
c  in DIMACS:
 15395  15396 -15397  429 -15398 0
 15395  15396 -15397  429 -15399 0
 15395  15396 -15397  429 -15400 0

c  0-1 --> -1
c    (-b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧ -p_429) -> ( b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0)
c  in CNF:
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨  b^{33, 14}_2
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_1
c     b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨  b^{33, 14}_0
c  in DIMACS:
 15395  15396  15397  429  15398 0
 15395  15396  15397  429 -15399 0
 15395  15396  15397  429  15400 0

c  -1-1 --> -2
c    ( b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧  b^{33, 13}_0 ∧ -p_429) -> ( b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0)
c  in CNF:
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨  b^{33, 14}_2
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨  b^{33, 14}_1
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨  p_429 ∨ -b^{33, 14}_0
c  in DIMACS:
-15395  15396 -15397  429  15398 0
-15395  15396 -15397  429  15399 0
-15395  15396 -15397  429 -15400 0

c  -2-1 --> break 
c    ( b^{33, 13}_2 ∧  b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨  b^{33, 13}_0 ∨  p_429 ∨ break
c  in DIMACS:
-15395 -15396  15397  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 13}_2 ∧ -b^{33, 13}_1 ∧ -b^{33, 13}_0 ∧ true) 
c  in CNF:
c    -b^{33, 13}_2 ∨  b^{33, 13}_1 ∨  b^{33, 13}_0 ∨ false 
c  in DIMACS:
-15395  15396  15397  0

c  3 does not represent an automaton state.
c    -(-b^{33, 13}_2 ∧  b^{33, 13}_1 ∧  b^{33, 13}_0 ∧ true) 
c  in CNF:
c     b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ false 
c  in DIMACS:
 15395 -15396 -15397  0
c  -3 does not represent an automaton state.
c    -( b^{33, 13}_2 ∧  b^{33, 13}_1 ∧  b^{33, 13}_0 ∧ true) 
c  in CNF:
c    -b^{33, 13}_2 ∨ -b^{33, 13}_1 ∨ -b^{33, 13}_0 ∨ false 
c  in DIMACS:
-15395 -15396 -15397  0

c i = 14
c  -2+1 --> -1
c    ( b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧  p_462) -> ( b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0)
c  in CNF:
c    -b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨  b^{33, 15}_2
c    -b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_1
c    -b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨  b^{33, 15}_0
c  in DIMACS:
-15398 -15399  15400 -462  15401 0
-15398 -15399  15400 -462 -15402 0
-15398 -15399  15400 -462  15403 0

c  -1+1 --> 0
c    ( b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0 ∧  p_462) -> (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧ -b^{33, 15}_0)
c  in CNF:
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_2
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_1
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_0
c  in DIMACS:
-15398  15399 -15400 -462 -15401 0
-15398  15399 -15400 -462 -15402 0
-15398  15399 -15400 -462 -15403 0

c  0+1 --> 1
c    (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧  p_462) -> (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0)
c  in CNF:
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_2
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_1
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨  b^{33, 15}_0
c  in DIMACS:
 15398  15399  15400 -462 -15401 0
 15398  15399  15400 -462 -15402 0
 15398  15399  15400 -462  15403 0

c  1+1 --> 2
c    (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0 ∧  p_462) -> (-b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0)
c  in CNF:
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_2
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨  b^{33, 15}_1
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ -p_462 ∨ -b^{33, 15}_0
c  in DIMACS:
 15398  15399 -15400 -462 -15401 0
 15398  15399 -15400 -462  15402 0
 15398  15399 -15400 -462 -15403 0

c  2+1 --> break 
c    (-b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧  p_462) -> break
c  in CNF:
c     b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 15398 -15399  15400 -462 1162 0


c  2-1 --> 1
c    (-b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧ -p_462) -> (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0)
c  in CNF:
c     b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_2
c     b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_1
c     b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨  b^{33, 15}_0
c  in DIMACS:
 15398 -15399  15400  462 -15401 0
 15398 -15399  15400  462 -15402 0
 15398 -15399  15400  462  15403 0

c  1-1 --> 0
c    (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0 ∧ -p_462) -> (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧ -b^{33, 15}_0)
c  in CNF:
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_2
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_1
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_0
c  in DIMACS:
 15398  15399 -15400  462 -15401 0
 15398  15399 -15400  462 -15402 0
 15398  15399 -15400  462 -15403 0

c  0-1 --> -1
c    (-b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧ -p_462) -> ( b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0)
c  in CNF:
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨  b^{33, 15}_2
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_1
c     b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨  b^{33, 15}_0
c  in DIMACS:
 15398  15399  15400  462  15401 0
 15398  15399  15400  462 -15402 0
 15398  15399  15400  462  15403 0

c  -1-1 --> -2
c    ( b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧  b^{33, 14}_0 ∧ -p_462) -> ( b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0)
c  in CNF:
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨  b^{33, 15}_2
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨  b^{33, 15}_1
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨  p_462 ∨ -b^{33, 15}_0
c  in DIMACS:
-15398  15399 -15400  462  15401 0
-15398  15399 -15400  462  15402 0
-15398  15399 -15400  462 -15403 0

c  -2-1 --> break 
c    ( b^{33, 14}_2 ∧  b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨  b^{33, 14}_0 ∨  p_462 ∨ break
c  in DIMACS:
-15398 -15399  15400  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 14}_2 ∧ -b^{33, 14}_1 ∧ -b^{33, 14}_0 ∧ true) 
c  in CNF:
c    -b^{33, 14}_2 ∨  b^{33, 14}_1 ∨  b^{33, 14}_0 ∨ false 
c  in DIMACS:
-15398  15399  15400  0

c  3 does not represent an automaton state.
c    -(-b^{33, 14}_2 ∧  b^{33, 14}_1 ∧  b^{33, 14}_0 ∧ true) 
c  in CNF:
c     b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ false 
c  in DIMACS:
 15398 -15399 -15400  0
c  -3 does not represent an automaton state.
c    -( b^{33, 14}_2 ∧  b^{33, 14}_1 ∧  b^{33, 14}_0 ∧ true) 
c  in CNF:
c    -b^{33, 14}_2 ∨ -b^{33, 14}_1 ∨ -b^{33, 14}_0 ∨ false 
c  in DIMACS:
-15398 -15399 -15400  0

c i = 15
c  -2+1 --> -1
c    ( b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧  p_495) -> ( b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0)
c  in CNF:
c    -b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨  b^{33, 16}_2
c    -b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_1
c    -b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨  b^{33, 16}_0
c  in DIMACS:
-15401 -15402  15403 -495  15404 0
-15401 -15402  15403 -495 -15405 0
-15401 -15402  15403 -495  15406 0

c  -1+1 --> 0
c    ( b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0 ∧  p_495) -> (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧ -b^{33, 16}_0)
c  in CNF:
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_2
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_1
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_0
c  in DIMACS:
-15401  15402 -15403 -495 -15404 0
-15401  15402 -15403 -495 -15405 0
-15401  15402 -15403 -495 -15406 0

c  0+1 --> 1
c    (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧  p_495) -> (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0)
c  in CNF:
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_2
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_1
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨  b^{33, 16}_0
c  in DIMACS:
 15401  15402  15403 -495 -15404 0
 15401  15402  15403 -495 -15405 0
 15401  15402  15403 -495  15406 0

c  1+1 --> 2
c    (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0 ∧  p_495) -> (-b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0)
c  in CNF:
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_2
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨  b^{33, 16}_1
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ -p_495 ∨ -b^{33, 16}_0
c  in DIMACS:
 15401  15402 -15403 -495 -15404 0
 15401  15402 -15403 -495  15405 0
 15401  15402 -15403 -495 -15406 0

c  2+1 --> break 
c    (-b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧  p_495) -> break
c  in CNF:
c     b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 15401 -15402  15403 -495 1162 0


c  2-1 --> 1
c    (-b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧ -p_495) -> (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0)
c  in CNF:
c     b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_2
c     b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_1
c     b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨  b^{33, 16}_0
c  in DIMACS:
 15401 -15402  15403  495 -15404 0
 15401 -15402  15403  495 -15405 0
 15401 -15402  15403  495  15406 0

c  1-1 --> 0
c    (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0 ∧ -p_495) -> (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧ -b^{33, 16}_0)
c  in CNF:
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_2
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_1
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_0
c  in DIMACS:
 15401  15402 -15403  495 -15404 0
 15401  15402 -15403  495 -15405 0
 15401  15402 -15403  495 -15406 0

c  0-1 --> -1
c    (-b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧ -p_495) -> ( b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0)
c  in CNF:
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨  b^{33, 16}_2
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_1
c     b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨  b^{33, 16}_0
c  in DIMACS:
 15401  15402  15403  495  15404 0
 15401  15402  15403  495 -15405 0
 15401  15402  15403  495  15406 0

c  -1-1 --> -2
c    ( b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧  b^{33, 15}_0 ∧ -p_495) -> ( b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0)
c  in CNF:
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨  b^{33, 16}_2
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨  b^{33, 16}_1
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨  p_495 ∨ -b^{33, 16}_0
c  in DIMACS:
-15401  15402 -15403  495  15404 0
-15401  15402 -15403  495  15405 0
-15401  15402 -15403  495 -15406 0

c  -2-1 --> break 
c    ( b^{33, 15}_2 ∧  b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨  b^{33, 15}_0 ∨  p_495 ∨ break
c  in DIMACS:
-15401 -15402  15403  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 15}_2 ∧ -b^{33, 15}_1 ∧ -b^{33, 15}_0 ∧ true) 
c  in CNF:
c    -b^{33, 15}_2 ∨  b^{33, 15}_1 ∨  b^{33, 15}_0 ∨ false 
c  in DIMACS:
-15401  15402  15403  0

c  3 does not represent an automaton state.
c    -(-b^{33, 15}_2 ∧  b^{33, 15}_1 ∧  b^{33, 15}_0 ∧ true) 
c  in CNF:
c     b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ false 
c  in DIMACS:
 15401 -15402 -15403  0
c  -3 does not represent an automaton state.
c    -( b^{33, 15}_2 ∧  b^{33, 15}_1 ∧  b^{33, 15}_0 ∧ true) 
c  in CNF:
c    -b^{33, 15}_2 ∨ -b^{33, 15}_1 ∨ -b^{33, 15}_0 ∨ false 
c  in DIMACS:
-15401 -15402 -15403  0

c i = 16
c  -2+1 --> -1
c    ( b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧  p_528) -> ( b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0)
c  in CNF:
c    -b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨  b^{33, 17}_2
c    -b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_1
c    -b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨  b^{33, 17}_0
c  in DIMACS:
-15404 -15405  15406 -528  15407 0
-15404 -15405  15406 -528 -15408 0
-15404 -15405  15406 -528  15409 0

c  -1+1 --> 0
c    ( b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0 ∧  p_528) -> (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧ -b^{33, 17}_0)
c  in CNF:
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_2
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_1
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_0
c  in DIMACS:
-15404  15405 -15406 -528 -15407 0
-15404  15405 -15406 -528 -15408 0
-15404  15405 -15406 -528 -15409 0

c  0+1 --> 1
c    (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧  p_528) -> (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0)
c  in CNF:
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_2
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_1
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨  b^{33, 17}_0
c  in DIMACS:
 15404  15405  15406 -528 -15407 0
 15404  15405  15406 -528 -15408 0
 15404  15405  15406 -528  15409 0

c  1+1 --> 2
c    (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0 ∧  p_528) -> (-b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0)
c  in CNF:
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_2
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨  b^{33, 17}_1
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ -p_528 ∨ -b^{33, 17}_0
c  in DIMACS:
 15404  15405 -15406 -528 -15407 0
 15404  15405 -15406 -528  15408 0
 15404  15405 -15406 -528 -15409 0

c  2+1 --> break 
c    (-b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧  p_528) -> break
c  in CNF:
c     b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 15404 -15405  15406 -528 1162 0


c  2-1 --> 1
c    (-b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧ -p_528) -> (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0)
c  in CNF:
c     b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_2
c     b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_1
c     b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨  b^{33, 17}_0
c  in DIMACS:
 15404 -15405  15406  528 -15407 0
 15404 -15405  15406  528 -15408 0
 15404 -15405  15406  528  15409 0

c  1-1 --> 0
c    (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0 ∧ -p_528) -> (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧ -b^{33, 17}_0)
c  in CNF:
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_2
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_1
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_0
c  in DIMACS:
 15404  15405 -15406  528 -15407 0
 15404  15405 -15406  528 -15408 0
 15404  15405 -15406  528 -15409 0

c  0-1 --> -1
c    (-b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧ -p_528) -> ( b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0)
c  in CNF:
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨  b^{33, 17}_2
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_1
c     b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨  b^{33, 17}_0
c  in DIMACS:
 15404  15405  15406  528  15407 0
 15404  15405  15406  528 -15408 0
 15404  15405  15406  528  15409 0

c  -1-1 --> -2
c    ( b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧  b^{33, 16}_0 ∧ -p_528) -> ( b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0)
c  in CNF:
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨  b^{33, 17}_2
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨  b^{33, 17}_1
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨  p_528 ∨ -b^{33, 17}_0
c  in DIMACS:
-15404  15405 -15406  528  15407 0
-15404  15405 -15406  528  15408 0
-15404  15405 -15406  528 -15409 0

c  -2-1 --> break 
c    ( b^{33, 16}_2 ∧  b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨  b^{33, 16}_0 ∨  p_528 ∨ break
c  in DIMACS:
-15404 -15405  15406  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 16}_2 ∧ -b^{33, 16}_1 ∧ -b^{33, 16}_0 ∧ true) 
c  in CNF:
c    -b^{33, 16}_2 ∨  b^{33, 16}_1 ∨  b^{33, 16}_0 ∨ false 
c  in DIMACS:
-15404  15405  15406  0

c  3 does not represent an automaton state.
c    -(-b^{33, 16}_2 ∧  b^{33, 16}_1 ∧  b^{33, 16}_0 ∧ true) 
c  in CNF:
c     b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ false 
c  in DIMACS:
 15404 -15405 -15406  0
c  -3 does not represent an automaton state.
c    -( b^{33, 16}_2 ∧  b^{33, 16}_1 ∧  b^{33, 16}_0 ∧ true) 
c  in CNF:
c    -b^{33, 16}_2 ∨ -b^{33, 16}_1 ∨ -b^{33, 16}_0 ∨ false 
c  in DIMACS:
-15404 -15405 -15406  0

c i = 17
c  -2+1 --> -1
c    ( b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧  p_561) -> ( b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0)
c  in CNF:
c    -b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨  b^{33, 18}_2
c    -b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_1
c    -b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨  b^{33, 18}_0
c  in DIMACS:
-15407 -15408  15409 -561  15410 0
-15407 -15408  15409 -561 -15411 0
-15407 -15408  15409 -561  15412 0

c  -1+1 --> 0
c    ( b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0 ∧  p_561) -> (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧ -b^{33, 18}_0)
c  in CNF:
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_2
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_1
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_0
c  in DIMACS:
-15407  15408 -15409 -561 -15410 0
-15407  15408 -15409 -561 -15411 0
-15407  15408 -15409 -561 -15412 0

c  0+1 --> 1
c    (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧  p_561) -> (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0)
c  in CNF:
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_2
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_1
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨  b^{33, 18}_0
c  in DIMACS:
 15407  15408  15409 -561 -15410 0
 15407  15408  15409 -561 -15411 0
 15407  15408  15409 -561  15412 0

c  1+1 --> 2
c    (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0 ∧  p_561) -> (-b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0)
c  in CNF:
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_2
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨  b^{33, 18}_1
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ -p_561 ∨ -b^{33, 18}_0
c  in DIMACS:
 15407  15408 -15409 -561 -15410 0
 15407  15408 -15409 -561  15411 0
 15407  15408 -15409 -561 -15412 0

c  2+1 --> break 
c    (-b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧  p_561) -> break
c  in CNF:
c     b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 15407 -15408  15409 -561 1162 0


c  2-1 --> 1
c    (-b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧ -p_561) -> (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0)
c  in CNF:
c     b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_2
c     b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_1
c     b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨  b^{33, 18}_0
c  in DIMACS:
 15407 -15408  15409  561 -15410 0
 15407 -15408  15409  561 -15411 0
 15407 -15408  15409  561  15412 0

c  1-1 --> 0
c    (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0 ∧ -p_561) -> (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧ -b^{33, 18}_0)
c  in CNF:
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_2
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_1
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_0
c  in DIMACS:
 15407  15408 -15409  561 -15410 0
 15407  15408 -15409  561 -15411 0
 15407  15408 -15409  561 -15412 0

c  0-1 --> -1
c    (-b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧ -p_561) -> ( b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0)
c  in CNF:
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨  b^{33, 18}_2
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_1
c     b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨  b^{33, 18}_0
c  in DIMACS:
 15407  15408  15409  561  15410 0
 15407  15408  15409  561 -15411 0
 15407  15408  15409  561  15412 0

c  -1-1 --> -2
c    ( b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧  b^{33, 17}_0 ∧ -p_561) -> ( b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0)
c  in CNF:
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨  b^{33, 18}_2
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨  b^{33, 18}_1
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨  p_561 ∨ -b^{33, 18}_0
c  in DIMACS:
-15407  15408 -15409  561  15410 0
-15407  15408 -15409  561  15411 0
-15407  15408 -15409  561 -15412 0

c  -2-1 --> break 
c    ( b^{33, 17}_2 ∧  b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨  b^{33, 17}_0 ∨  p_561 ∨ break
c  in DIMACS:
-15407 -15408  15409  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 17}_2 ∧ -b^{33, 17}_1 ∧ -b^{33, 17}_0 ∧ true) 
c  in CNF:
c    -b^{33, 17}_2 ∨  b^{33, 17}_1 ∨  b^{33, 17}_0 ∨ false 
c  in DIMACS:
-15407  15408  15409  0

c  3 does not represent an automaton state.
c    -(-b^{33, 17}_2 ∧  b^{33, 17}_1 ∧  b^{33, 17}_0 ∧ true) 
c  in CNF:
c     b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ false 
c  in DIMACS:
 15407 -15408 -15409  0
c  -3 does not represent an automaton state.
c    -( b^{33, 17}_2 ∧  b^{33, 17}_1 ∧  b^{33, 17}_0 ∧ true) 
c  in CNF:
c    -b^{33, 17}_2 ∨ -b^{33, 17}_1 ∨ -b^{33, 17}_0 ∨ false 
c  in DIMACS:
-15407 -15408 -15409  0

c i = 18
c  -2+1 --> -1
c    ( b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧  p_594) -> ( b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0)
c  in CNF:
c    -b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨  b^{33, 19}_2
c    -b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_1
c    -b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨  b^{33, 19}_0
c  in DIMACS:
-15410 -15411  15412 -594  15413 0
-15410 -15411  15412 -594 -15414 0
-15410 -15411  15412 -594  15415 0

c  -1+1 --> 0
c    ( b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0 ∧  p_594) -> (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧ -b^{33, 19}_0)
c  in CNF:
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_2
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_1
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_0
c  in DIMACS:
-15410  15411 -15412 -594 -15413 0
-15410  15411 -15412 -594 -15414 0
-15410  15411 -15412 -594 -15415 0

c  0+1 --> 1
c    (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧  p_594) -> (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0)
c  in CNF:
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_2
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_1
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨  b^{33, 19}_0
c  in DIMACS:
 15410  15411  15412 -594 -15413 0
 15410  15411  15412 -594 -15414 0
 15410  15411  15412 -594  15415 0

c  1+1 --> 2
c    (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0 ∧  p_594) -> (-b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0)
c  in CNF:
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_2
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨  b^{33, 19}_1
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ -p_594 ∨ -b^{33, 19}_0
c  in DIMACS:
 15410  15411 -15412 -594 -15413 0
 15410  15411 -15412 -594  15414 0
 15410  15411 -15412 -594 -15415 0

c  2+1 --> break 
c    (-b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧  p_594) -> break
c  in CNF:
c     b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 15410 -15411  15412 -594 1162 0


c  2-1 --> 1
c    (-b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧ -p_594) -> (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0)
c  in CNF:
c     b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_2
c     b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_1
c     b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨  b^{33, 19}_0
c  in DIMACS:
 15410 -15411  15412  594 -15413 0
 15410 -15411  15412  594 -15414 0
 15410 -15411  15412  594  15415 0

c  1-1 --> 0
c    (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0 ∧ -p_594) -> (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧ -b^{33, 19}_0)
c  in CNF:
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_2
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_1
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_0
c  in DIMACS:
 15410  15411 -15412  594 -15413 0
 15410  15411 -15412  594 -15414 0
 15410  15411 -15412  594 -15415 0

c  0-1 --> -1
c    (-b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧ -p_594) -> ( b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0)
c  in CNF:
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨  b^{33, 19}_2
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_1
c     b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨  b^{33, 19}_0
c  in DIMACS:
 15410  15411  15412  594  15413 0
 15410  15411  15412  594 -15414 0
 15410  15411  15412  594  15415 0

c  -1-1 --> -2
c    ( b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧  b^{33, 18}_0 ∧ -p_594) -> ( b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0)
c  in CNF:
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨  b^{33, 19}_2
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨  b^{33, 19}_1
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨  p_594 ∨ -b^{33, 19}_0
c  in DIMACS:
-15410  15411 -15412  594  15413 0
-15410  15411 -15412  594  15414 0
-15410  15411 -15412  594 -15415 0

c  -2-1 --> break 
c    ( b^{33, 18}_2 ∧  b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨  b^{33, 18}_0 ∨  p_594 ∨ break
c  in DIMACS:
-15410 -15411  15412  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 18}_2 ∧ -b^{33, 18}_1 ∧ -b^{33, 18}_0 ∧ true) 
c  in CNF:
c    -b^{33, 18}_2 ∨  b^{33, 18}_1 ∨  b^{33, 18}_0 ∨ false 
c  in DIMACS:
-15410  15411  15412  0

c  3 does not represent an automaton state.
c    -(-b^{33, 18}_2 ∧  b^{33, 18}_1 ∧  b^{33, 18}_0 ∧ true) 
c  in CNF:
c     b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ false 
c  in DIMACS:
 15410 -15411 -15412  0
c  -3 does not represent an automaton state.
c    -( b^{33, 18}_2 ∧  b^{33, 18}_1 ∧  b^{33, 18}_0 ∧ true) 
c  in CNF:
c    -b^{33, 18}_2 ∨ -b^{33, 18}_1 ∨ -b^{33, 18}_0 ∨ false 
c  in DIMACS:
-15410 -15411 -15412  0

c i = 19
c  -2+1 --> -1
c    ( b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧  p_627) -> ( b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0)
c  in CNF:
c    -b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨  b^{33, 20}_2
c    -b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_1
c    -b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨  b^{33, 20}_0
c  in DIMACS:
-15413 -15414  15415 -627  15416 0
-15413 -15414  15415 -627 -15417 0
-15413 -15414  15415 -627  15418 0

c  -1+1 --> 0
c    ( b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0 ∧  p_627) -> (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧ -b^{33, 20}_0)
c  in CNF:
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_2
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_1
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_0
c  in DIMACS:
-15413  15414 -15415 -627 -15416 0
-15413  15414 -15415 -627 -15417 0
-15413  15414 -15415 -627 -15418 0

c  0+1 --> 1
c    (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧  p_627) -> (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0)
c  in CNF:
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_2
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_1
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨  b^{33, 20}_0
c  in DIMACS:
 15413  15414  15415 -627 -15416 0
 15413  15414  15415 -627 -15417 0
 15413  15414  15415 -627  15418 0

c  1+1 --> 2
c    (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0 ∧  p_627) -> (-b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0)
c  in CNF:
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_2
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨  b^{33, 20}_1
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ -p_627 ∨ -b^{33, 20}_0
c  in DIMACS:
 15413  15414 -15415 -627 -15416 0
 15413  15414 -15415 -627  15417 0
 15413  15414 -15415 -627 -15418 0

c  2+1 --> break 
c    (-b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧  p_627) -> break
c  in CNF:
c     b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 15413 -15414  15415 -627 1162 0


c  2-1 --> 1
c    (-b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧ -p_627) -> (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0)
c  in CNF:
c     b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_2
c     b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_1
c     b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨  b^{33, 20}_0
c  in DIMACS:
 15413 -15414  15415  627 -15416 0
 15413 -15414  15415  627 -15417 0
 15413 -15414  15415  627  15418 0

c  1-1 --> 0
c    (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0 ∧ -p_627) -> (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧ -b^{33, 20}_0)
c  in CNF:
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_2
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_1
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_0
c  in DIMACS:
 15413  15414 -15415  627 -15416 0
 15413  15414 -15415  627 -15417 0
 15413  15414 -15415  627 -15418 0

c  0-1 --> -1
c    (-b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧ -p_627) -> ( b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0)
c  in CNF:
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨  b^{33, 20}_2
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_1
c     b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨  b^{33, 20}_0
c  in DIMACS:
 15413  15414  15415  627  15416 0
 15413  15414  15415  627 -15417 0
 15413  15414  15415  627  15418 0

c  -1-1 --> -2
c    ( b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧  b^{33, 19}_0 ∧ -p_627) -> ( b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0)
c  in CNF:
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨  b^{33, 20}_2
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨  b^{33, 20}_1
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨  p_627 ∨ -b^{33, 20}_0
c  in DIMACS:
-15413  15414 -15415  627  15416 0
-15413  15414 -15415  627  15417 0
-15413  15414 -15415  627 -15418 0

c  -2-1 --> break 
c    ( b^{33, 19}_2 ∧  b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨  b^{33, 19}_0 ∨  p_627 ∨ break
c  in DIMACS:
-15413 -15414  15415  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 19}_2 ∧ -b^{33, 19}_1 ∧ -b^{33, 19}_0 ∧ true) 
c  in CNF:
c    -b^{33, 19}_2 ∨  b^{33, 19}_1 ∨  b^{33, 19}_0 ∨ false 
c  in DIMACS:
-15413  15414  15415  0

c  3 does not represent an automaton state.
c    -(-b^{33, 19}_2 ∧  b^{33, 19}_1 ∧  b^{33, 19}_0 ∧ true) 
c  in CNF:
c     b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ false 
c  in DIMACS:
 15413 -15414 -15415  0
c  -3 does not represent an automaton state.
c    -( b^{33, 19}_2 ∧  b^{33, 19}_1 ∧  b^{33, 19}_0 ∧ true) 
c  in CNF:
c    -b^{33, 19}_2 ∨ -b^{33, 19}_1 ∨ -b^{33, 19}_0 ∨ false 
c  in DIMACS:
-15413 -15414 -15415  0

c i = 20
c  -2+1 --> -1
c    ( b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧  p_660) -> ( b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0)
c  in CNF:
c    -b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨  b^{33, 21}_2
c    -b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_1
c    -b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨  b^{33, 21}_0
c  in DIMACS:
-15416 -15417  15418 -660  15419 0
-15416 -15417  15418 -660 -15420 0
-15416 -15417  15418 -660  15421 0

c  -1+1 --> 0
c    ( b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0 ∧  p_660) -> (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧ -b^{33, 21}_0)
c  in CNF:
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_2
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_1
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_0
c  in DIMACS:
-15416  15417 -15418 -660 -15419 0
-15416  15417 -15418 -660 -15420 0
-15416  15417 -15418 -660 -15421 0

c  0+1 --> 1
c    (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧  p_660) -> (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0)
c  in CNF:
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_2
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_1
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨  b^{33, 21}_0
c  in DIMACS:
 15416  15417  15418 -660 -15419 0
 15416  15417  15418 -660 -15420 0
 15416  15417  15418 -660  15421 0

c  1+1 --> 2
c    (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0 ∧  p_660) -> (-b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0)
c  in CNF:
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_2
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨  b^{33, 21}_1
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ -p_660 ∨ -b^{33, 21}_0
c  in DIMACS:
 15416  15417 -15418 -660 -15419 0
 15416  15417 -15418 -660  15420 0
 15416  15417 -15418 -660 -15421 0

c  2+1 --> break 
c    (-b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧  p_660) -> break
c  in CNF:
c     b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 15416 -15417  15418 -660 1162 0


c  2-1 --> 1
c    (-b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧ -p_660) -> (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0)
c  in CNF:
c     b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_2
c     b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_1
c     b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨  b^{33, 21}_0
c  in DIMACS:
 15416 -15417  15418  660 -15419 0
 15416 -15417  15418  660 -15420 0
 15416 -15417  15418  660  15421 0

c  1-1 --> 0
c    (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0 ∧ -p_660) -> (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧ -b^{33, 21}_0)
c  in CNF:
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_2
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_1
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_0
c  in DIMACS:
 15416  15417 -15418  660 -15419 0
 15416  15417 -15418  660 -15420 0
 15416  15417 -15418  660 -15421 0

c  0-1 --> -1
c    (-b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧ -p_660) -> ( b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0)
c  in CNF:
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨  b^{33, 21}_2
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_1
c     b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨  b^{33, 21}_0
c  in DIMACS:
 15416  15417  15418  660  15419 0
 15416  15417  15418  660 -15420 0
 15416  15417  15418  660  15421 0

c  -1-1 --> -2
c    ( b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧  b^{33, 20}_0 ∧ -p_660) -> ( b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0)
c  in CNF:
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨  b^{33, 21}_2
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨  b^{33, 21}_1
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨  p_660 ∨ -b^{33, 21}_0
c  in DIMACS:
-15416  15417 -15418  660  15419 0
-15416  15417 -15418  660  15420 0
-15416  15417 -15418  660 -15421 0

c  -2-1 --> break 
c    ( b^{33, 20}_2 ∧  b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨  b^{33, 20}_0 ∨  p_660 ∨ break
c  in DIMACS:
-15416 -15417  15418  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 20}_2 ∧ -b^{33, 20}_1 ∧ -b^{33, 20}_0 ∧ true) 
c  in CNF:
c    -b^{33, 20}_2 ∨  b^{33, 20}_1 ∨  b^{33, 20}_0 ∨ false 
c  in DIMACS:
-15416  15417  15418  0

c  3 does not represent an automaton state.
c    -(-b^{33, 20}_2 ∧  b^{33, 20}_1 ∧  b^{33, 20}_0 ∧ true) 
c  in CNF:
c     b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ false 
c  in DIMACS:
 15416 -15417 -15418  0
c  -3 does not represent an automaton state.
c    -( b^{33, 20}_2 ∧  b^{33, 20}_1 ∧  b^{33, 20}_0 ∧ true) 
c  in CNF:
c    -b^{33, 20}_2 ∨ -b^{33, 20}_1 ∨ -b^{33, 20}_0 ∨ false 
c  in DIMACS:
-15416 -15417 -15418  0

c i = 21
c  -2+1 --> -1
c    ( b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧  p_693) -> ( b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0)
c  in CNF:
c    -b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨  b^{33, 22}_2
c    -b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_1
c    -b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨  b^{33, 22}_0
c  in DIMACS:
-15419 -15420  15421 -693  15422 0
-15419 -15420  15421 -693 -15423 0
-15419 -15420  15421 -693  15424 0

c  -1+1 --> 0
c    ( b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0 ∧  p_693) -> (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧ -b^{33, 22}_0)
c  in CNF:
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_2
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_1
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_0
c  in DIMACS:
-15419  15420 -15421 -693 -15422 0
-15419  15420 -15421 -693 -15423 0
-15419  15420 -15421 -693 -15424 0

c  0+1 --> 1
c    (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧  p_693) -> (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0)
c  in CNF:
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_2
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_1
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨  b^{33, 22}_0
c  in DIMACS:
 15419  15420  15421 -693 -15422 0
 15419  15420  15421 -693 -15423 0
 15419  15420  15421 -693  15424 0

c  1+1 --> 2
c    (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0 ∧  p_693) -> (-b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0)
c  in CNF:
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_2
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨  b^{33, 22}_1
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ -p_693 ∨ -b^{33, 22}_0
c  in DIMACS:
 15419  15420 -15421 -693 -15422 0
 15419  15420 -15421 -693  15423 0
 15419  15420 -15421 -693 -15424 0

c  2+1 --> break 
c    (-b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧  p_693) -> break
c  in CNF:
c     b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 15419 -15420  15421 -693 1162 0


c  2-1 --> 1
c    (-b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧ -p_693) -> (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0)
c  in CNF:
c     b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_2
c     b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_1
c     b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨  b^{33, 22}_0
c  in DIMACS:
 15419 -15420  15421  693 -15422 0
 15419 -15420  15421  693 -15423 0
 15419 -15420  15421  693  15424 0

c  1-1 --> 0
c    (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0 ∧ -p_693) -> (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧ -b^{33, 22}_0)
c  in CNF:
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_2
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_1
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_0
c  in DIMACS:
 15419  15420 -15421  693 -15422 0
 15419  15420 -15421  693 -15423 0
 15419  15420 -15421  693 -15424 0

c  0-1 --> -1
c    (-b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧ -p_693) -> ( b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0)
c  in CNF:
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨  b^{33, 22}_2
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_1
c     b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨  b^{33, 22}_0
c  in DIMACS:
 15419  15420  15421  693  15422 0
 15419  15420  15421  693 -15423 0
 15419  15420  15421  693  15424 0

c  -1-1 --> -2
c    ( b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧  b^{33, 21}_0 ∧ -p_693) -> ( b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0)
c  in CNF:
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨  b^{33, 22}_2
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨  b^{33, 22}_1
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨  p_693 ∨ -b^{33, 22}_0
c  in DIMACS:
-15419  15420 -15421  693  15422 0
-15419  15420 -15421  693  15423 0
-15419  15420 -15421  693 -15424 0

c  -2-1 --> break 
c    ( b^{33, 21}_2 ∧  b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨  b^{33, 21}_0 ∨  p_693 ∨ break
c  in DIMACS:
-15419 -15420  15421  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 21}_2 ∧ -b^{33, 21}_1 ∧ -b^{33, 21}_0 ∧ true) 
c  in CNF:
c    -b^{33, 21}_2 ∨  b^{33, 21}_1 ∨  b^{33, 21}_0 ∨ false 
c  in DIMACS:
-15419  15420  15421  0

c  3 does not represent an automaton state.
c    -(-b^{33, 21}_2 ∧  b^{33, 21}_1 ∧  b^{33, 21}_0 ∧ true) 
c  in CNF:
c     b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ false 
c  in DIMACS:
 15419 -15420 -15421  0
c  -3 does not represent an automaton state.
c    -( b^{33, 21}_2 ∧  b^{33, 21}_1 ∧  b^{33, 21}_0 ∧ true) 
c  in CNF:
c    -b^{33, 21}_2 ∨ -b^{33, 21}_1 ∨ -b^{33, 21}_0 ∨ false 
c  in DIMACS:
-15419 -15420 -15421  0

c i = 22
c  -2+1 --> -1
c    ( b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧  p_726) -> ( b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0)
c  in CNF:
c    -b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨  b^{33, 23}_2
c    -b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_1
c    -b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨  b^{33, 23}_0
c  in DIMACS:
-15422 -15423  15424 -726  15425 0
-15422 -15423  15424 -726 -15426 0
-15422 -15423  15424 -726  15427 0

c  -1+1 --> 0
c    ( b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0 ∧  p_726) -> (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧ -b^{33, 23}_0)
c  in CNF:
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_2
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_1
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_0
c  in DIMACS:
-15422  15423 -15424 -726 -15425 0
-15422  15423 -15424 -726 -15426 0
-15422  15423 -15424 -726 -15427 0

c  0+1 --> 1
c    (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧  p_726) -> (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0)
c  in CNF:
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_2
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_1
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨  b^{33, 23}_0
c  in DIMACS:
 15422  15423  15424 -726 -15425 0
 15422  15423  15424 -726 -15426 0
 15422  15423  15424 -726  15427 0

c  1+1 --> 2
c    (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0 ∧  p_726) -> (-b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0)
c  in CNF:
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_2
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨  b^{33, 23}_1
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ -p_726 ∨ -b^{33, 23}_0
c  in DIMACS:
 15422  15423 -15424 -726 -15425 0
 15422  15423 -15424 -726  15426 0
 15422  15423 -15424 -726 -15427 0

c  2+1 --> break 
c    (-b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧  p_726) -> break
c  in CNF:
c     b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 15422 -15423  15424 -726 1162 0


c  2-1 --> 1
c    (-b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧ -p_726) -> (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0)
c  in CNF:
c     b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_2
c     b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_1
c     b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨  b^{33, 23}_0
c  in DIMACS:
 15422 -15423  15424  726 -15425 0
 15422 -15423  15424  726 -15426 0
 15422 -15423  15424  726  15427 0

c  1-1 --> 0
c    (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0 ∧ -p_726) -> (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧ -b^{33, 23}_0)
c  in CNF:
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_2
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_1
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_0
c  in DIMACS:
 15422  15423 -15424  726 -15425 0
 15422  15423 -15424  726 -15426 0
 15422  15423 -15424  726 -15427 0

c  0-1 --> -1
c    (-b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧ -p_726) -> ( b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0)
c  in CNF:
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨  b^{33, 23}_2
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_1
c     b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨  b^{33, 23}_0
c  in DIMACS:
 15422  15423  15424  726  15425 0
 15422  15423  15424  726 -15426 0
 15422  15423  15424  726  15427 0

c  -1-1 --> -2
c    ( b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧  b^{33, 22}_0 ∧ -p_726) -> ( b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0)
c  in CNF:
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨  b^{33, 23}_2
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨  b^{33, 23}_1
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨  p_726 ∨ -b^{33, 23}_0
c  in DIMACS:
-15422  15423 -15424  726  15425 0
-15422  15423 -15424  726  15426 0
-15422  15423 -15424  726 -15427 0

c  -2-1 --> break 
c    ( b^{33, 22}_2 ∧  b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨  b^{33, 22}_0 ∨  p_726 ∨ break
c  in DIMACS:
-15422 -15423  15424  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 22}_2 ∧ -b^{33, 22}_1 ∧ -b^{33, 22}_0 ∧ true) 
c  in CNF:
c    -b^{33, 22}_2 ∨  b^{33, 22}_1 ∨  b^{33, 22}_0 ∨ false 
c  in DIMACS:
-15422  15423  15424  0

c  3 does not represent an automaton state.
c    -(-b^{33, 22}_2 ∧  b^{33, 22}_1 ∧  b^{33, 22}_0 ∧ true) 
c  in CNF:
c     b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ false 
c  in DIMACS:
 15422 -15423 -15424  0
c  -3 does not represent an automaton state.
c    -( b^{33, 22}_2 ∧  b^{33, 22}_1 ∧  b^{33, 22}_0 ∧ true) 
c  in CNF:
c    -b^{33, 22}_2 ∨ -b^{33, 22}_1 ∨ -b^{33, 22}_0 ∨ false 
c  in DIMACS:
-15422 -15423 -15424  0

c i = 23
c  -2+1 --> -1
c    ( b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧  p_759) -> ( b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0)
c  in CNF:
c    -b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨  b^{33, 24}_2
c    -b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_1
c    -b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨  b^{33, 24}_0
c  in DIMACS:
-15425 -15426  15427 -759  15428 0
-15425 -15426  15427 -759 -15429 0
-15425 -15426  15427 -759  15430 0

c  -1+1 --> 0
c    ( b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0 ∧  p_759) -> (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧ -b^{33, 24}_0)
c  in CNF:
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_2
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_1
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_0
c  in DIMACS:
-15425  15426 -15427 -759 -15428 0
-15425  15426 -15427 -759 -15429 0
-15425  15426 -15427 -759 -15430 0

c  0+1 --> 1
c    (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧  p_759) -> (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0)
c  in CNF:
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_2
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_1
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨  b^{33, 24}_0
c  in DIMACS:
 15425  15426  15427 -759 -15428 0
 15425  15426  15427 -759 -15429 0
 15425  15426  15427 -759  15430 0

c  1+1 --> 2
c    (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0 ∧  p_759) -> (-b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0)
c  in CNF:
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_2
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨  b^{33, 24}_1
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ -p_759 ∨ -b^{33, 24}_0
c  in DIMACS:
 15425  15426 -15427 -759 -15428 0
 15425  15426 -15427 -759  15429 0
 15425  15426 -15427 -759 -15430 0

c  2+1 --> break 
c    (-b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧  p_759) -> break
c  in CNF:
c     b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 15425 -15426  15427 -759 1162 0


c  2-1 --> 1
c    (-b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧ -p_759) -> (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0)
c  in CNF:
c     b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_2
c     b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_1
c     b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨  b^{33, 24}_0
c  in DIMACS:
 15425 -15426  15427  759 -15428 0
 15425 -15426  15427  759 -15429 0
 15425 -15426  15427  759  15430 0

c  1-1 --> 0
c    (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0 ∧ -p_759) -> (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧ -b^{33, 24}_0)
c  in CNF:
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_2
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_1
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_0
c  in DIMACS:
 15425  15426 -15427  759 -15428 0
 15425  15426 -15427  759 -15429 0
 15425  15426 -15427  759 -15430 0

c  0-1 --> -1
c    (-b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧ -p_759) -> ( b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0)
c  in CNF:
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨  b^{33, 24}_2
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_1
c     b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨  b^{33, 24}_0
c  in DIMACS:
 15425  15426  15427  759  15428 0
 15425  15426  15427  759 -15429 0
 15425  15426  15427  759  15430 0

c  -1-1 --> -2
c    ( b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧  b^{33, 23}_0 ∧ -p_759) -> ( b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0)
c  in CNF:
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨  b^{33, 24}_2
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨  b^{33, 24}_1
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨  p_759 ∨ -b^{33, 24}_0
c  in DIMACS:
-15425  15426 -15427  759  15428 0
-15425  15426 -15427  759  15429 0
-15425  15426 -15427  759 -15430 0

c  -2-1 --> break 
c    ( b^{33, 23}_2 ∧  b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨  b^{33, 23}_0 ∨  p_759 ∨ break
c  in DIMACS:
-15425 -15426  15427  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 23}_2 ∧ -b^{33, 23}_1 ∧ -b^{33, 23}_0 ∧ true) 
c  in CNF:
c    -b^{33, 23}_2 ∨  b^{33, 23}_1 ∨  b^{33, 23}_0 ∨ false 
c  in DIMACS:
-15425  15426  15427  0

c  3 does not represent an automaton state.
c    -(-b^{33, 23}_2 ∧  b^{33, 23}_1 ∧  b^{33, 23}_0 ∧ true) 
c  in CNF:
c     b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ false 
c  in DIMACS:
 15425 -15426 -15427  0
c  -3 does not represent an automaton state.
c    -( b^{33, 23}_2 ∧  b^{33, 23}_1 ∧  b^{33, 23}_0 ∧ true) 
c  in CNF:
c    -b^{33, 23}_2 ∨ -b^{33, 23}_1 ∨ -b^{33, 23}_0 ∨ false 
c  in DIMACS:
-15425 -15426 -15427  0

c i = 24
c  -2+1 --> -1
c    ( b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧  p_792) -> ( b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0)
c  in CNF:
c    -b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨  b^{33, 25}_2
c    -b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_1
c    -b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨  b^{33, 25}_0
c  in DIMACS:
-15428 -15429  15430 -792  15431 0
-15428 -15429  15430 -792 -15432 0
-15428 -15429  15430 -792  15433 0

c  -1+1 --> 0
c    ( b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0 ∧  p_792) -> (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧ -b^{33, 25}_0)
c  in CNF:
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_2
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_1
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_0
c  in DIMACS:
-15428  15429 -15430 -792 -15431 0
-15428  15429 -15430 -792 -15432 0
-15428  15429 -15430 -792 -15433 0

c  0+1 --> 1
c    (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧  p_792) -> (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0)
c  in CNF:
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_2
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_1
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨  b^{33, 25}_0
c  in DIMACS:
 15428  15429  15430 -792 -15431 0
 15428  15429  15430 -792 -15432 0
 15428  15429  15430 -792  15433 0

c  1+1 --> 2
c    (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0 ∧  p_792) -> (-b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0)
c  in CNF:
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_2
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨  b^{33, 25}_1
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ -p_792 ∨ -b^{33, 25}_0
c  in DIMACS:
 15428  15429 -15430 -792 -15431 0
 15428  15429 -15430 -792  15432 0
 15428  15429 -15430 -792 -15433 0

c  2+1 --> break 
c    (-b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧  p_792) -> break
c  in CNF:
c     b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 15428 -15429  15430 -792 1162 0


c  2-1 --> 1
c    (-b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧ -p_792) -> (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0)
c  in CNF:
c     b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_2
c     b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_1
c     b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨  b^{33, 25}_0
c  in DIMACS:
 15428 -15429  15430  792 -15431 0
 15428 -15429  15430  792 -15432 0
 15428 -15429  15430  792  15433 0

c  1-1 --> 0
c    (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0 ∧ -p_792) -> (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧ -b^{33, 25}_0)
c  in CNF:
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_2
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_1
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_0
c  in DIMACS:
 15428  15429 -15430  792 -15431 0
 15428  15429 -15430  792 -15432 0
 15428  15429 -15430  792 -15433 0

c  0-1 --> -1
c    (-b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧ -p_792) -> ( b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0)
c  in CNF:
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨  b^{33, 25}_2
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_1
c     b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨  b^{33, 25}_0
c  in DIMACS:
 15428  15429  15430  792  15431 0
 15428  15429  15430  792 -15432 0
 15428  15429  15430  792  15433 0

c  -1-1 --> -2
c    ( b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧  b^{33, 24}_0 ∧ -p_792) -> ( b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0)
c  in CNF:
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨  b^{33, 25}_2
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨  b^{33, 25}_1
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨  p_792 ∨ -b^{33, 25}_0
c  in DIMACS:
-15428  15429 -15430  792  15431 0
-15428  15429 -15430  792  15432 0
-15428  15429 -15430  792 -15433 0

c  -2-1 --> break 
c    ( b^{33, 24}_2 ∧  b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨  b^{33, 24}_0 ∨  p_792 ∨ break
c  in DIMACS:
-15428 -15429  15430  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 24}_2 ∧ -b^{33, 24}_1 ∧ -b^{33, 24}_0 ∧ true) 
c  in CNF:
c    -b^{33, 24}_2 ∨  b^{33, 24}_1 ∨  b^{33, 24}_0 ∨ false 
c  in DIMACS:
-15428  15429  15430  0

c  3 does not represent an automaton state.
c    -(-b^{33, 24}_2 ∧  b^{33, 24}_1 ∧  b^{33, 24}_0 ∧ true) 
c  in CNF:
c     b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ false 
c  in DIMACS:
 15428 -15429 -15430  0
c  -3 does not represent an automaton state.
c    -( b^{33, 24}_2 ∧  b^{33, 24}_1 ∧  b^{33, 24}_0 ∧ true) 
c  in CNF:
c    -b^{33, 24}_2 ∨ -b^{33, 24}_1 ∨ -b^{33, 24}_0 ∨ false 
c  in DIMACS:
-15428 -15429 -15430  0

c i = 25
c  -2+1 --> -1
c    ( b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧  p_825) -> ( b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0)
c  in CNF:
c    -b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨  b^{33, 26}_2
c    -b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_1
c    -b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨  b^{33, 26}_0
c  in DIMACS:
-15431 -15432  15433 -825  15434 0
-15431 -15432  15433 -825 -15435 0
-15431 -15432  15433 -825  15436 0

c  -1+1 --> 0
c    ( b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0 ∧  p_825) -> (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧ -b^{33, 26}_0)
c  in CNF:
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_2
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_1
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_0
c  in DIMACS:
-15431  15432 -15433 -825 -15434 0
-15431  15432 -15433 -825 -15435 0
-15431  15432 -15433 -825 -15436 0

c  0+1 --> 1
c    (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧  p_825) -> (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0)
c  in CNF:
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_2
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_1
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨  b^{33, 26}_0
c  in DIMACS:
 15431  15432  15433 -825 -15434 0
 15431  15432  15433 -825 -15435 0
 15431  15432  15433 -825  15436 0

c  1+1 --> 2
c    (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0 ∧  p_825) -> (-b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0)
c  in CNF:
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_2
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨  b^{33, 26}_1
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ -p_825 ∨ -b^{33, 26}_0
c  in DIMACS:
 15431  15432 -15433 -825 -15434 0
 15431  15432 -15433 -825  15435 0
 15431  15432 -15433 -825 -15436 0

c  2+1 --> break 
c    (-b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧  p_825) -> break
c  in CNF:
c     b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 15431 -15432  15433 -825 1162 0


c  2-1 --> 1
c    (-b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧ -p_825) -> (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0)
c  in CNF:
c     b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_2
c     b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_1
c     b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨  b^{33, 26}_0
c  in DIMACS:
 15431 -15432  15433  825 -15434 0
 15431 -15432  15433  825 -15435 0
 15431 -15432  15433  825  15436 0

c  1-1 --> 0
c    (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0 ∧ -p_825) -> (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧ -b^{33, 26}_0)
c  in CNF:
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_2
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_1
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_0
c  in DIMACS:
 15431  15432 -15433  825 -15434 0
 15431  15432 -15433  825 -15435 0
 15431  15432 -15433  825 -15436 0

c  0-1 --> -1
c    (-b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧ -p_825) -> ( b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0)
c  in CNF:
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨  b^{33, 26}_2
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_1
c     b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨  b^{33, 26}_0
c  in DIMACS:
 15431  15432  15433  825  15434 0
 15431  15432  15433  825 -15435 0
 15431  15432  15433  825  15436 0

c  -1-1 --> -2
c    ( b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧  b^{33, 25}_0 ∧ -p_825) -> ( b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0)
c  in CNF:
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨  b^{33, 26}_2
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨  b^{33, 26}_1
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨  p_825 ∨ -b^{33, 26}_0
c  in DIMACS:
-15431  15432 -15433  825  15434 0
-15431  15432 -15433  825  15435 0
-15431  15432 -15433  825 -15436 0

c  -2-1 --> break 
c    ( b^{33, 25}_2 ∧  b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨  b^{33, 25}_0 ∨  p_825 ∨ break
c  in DIMACS:
-15431 -15432  15433  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 25}_2 ∧ -b^{33, 25}_1 ∧ -b^{33, 25}_0 ∧ true) 
c  in CNF:
c    -b^{33, 25}_2 ∨  b^{33, 25}_1 ∨  b^{33, 25}_0 ∨ false 
c  in DIMACS:
-15431  15432  15433  0

c  3 does not represent an automaton state.
c    -(-b^{33, 25}_2 ∧  b^{33, 25}_1 ∧  b^{33, 25}_0 ∧ true) 
c  in CNF:
c     b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ false 
c  in DIMACS:
 15431 -15432 -15433  0
c  -3 does not represent an automaton state.
c    -( b^{33, 25}_2 ∧  b^{33, 25}_1 ∧  b^{33, 25}_0 ∧ true) 
c  in CNF:
c    -b^{33, 25}_2 ∨ -b^{33, 25}_1 ∨ -b^{33, 25}_0 ∨ false 
c  in DIMACS:
-15431 -15432 -15433  0

c i = 26
c  -2+1 --> -1
c    ( b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧  p_858) -> ( b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0)
c  in CNF:
c    -b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨  b^{33, 27}_2
c    -b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_1
c    -b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨  b^{33, 27}_0
c  in DIMACS:
-15434 -15435  15436 -858  15437 0
-15434 -15435  15436 -858 -15438 0
-15434 -15435  15436 -858  15439 0

c  -1+1 --> 0
c    ( b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0 ∧  p_858) -> (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧ -b^{33, 27}_0)
c  in CNF:
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_2
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_1
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_0
c  in DIMACS:
-15434  15435 -15436 -858 -15437 0
-15434  15435 -15436 -858 -15438 0
-15434  15435 -15436 -858 -15439 0

c  0+1 --> 1
c    (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧  p_858) -> (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0)
c  in CNF:
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_2
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_1
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨  b^{33, 27}_0
c  in DIMACS:
 15434  15435  15436 -858 -15437 0
 15434  15435  15436 -858 -15438 0
 15434  15435  15436 -858  15439 0

c  1+1 --> 2
c    (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0 ∧  p_858) -> (-b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0)
c  in CNF:
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_2
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨  b^{33, 27}_1
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ -p_858 ∨ -b^{33, 27}_0
c  in DIMACS:
 15434  15435 -15436 -858 -15437 0
 15434  15435 -15436 -858  15438 0
 15434  15435 -15436 -858 -15439 0

c  2+1 --> break 
c    (-b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧  p_858) -> break
c  in CNF:
c     b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 15434 -15435  15436 -858 1162 0


c  2-1 --> 1
c    (-b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧ -p_858) -> (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0)
c  in CNF:
c     b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_2
c     b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_1
c     b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨  b^{33, 27}_0
c  in DIMACS:
 15434 -15435  15436  858 -15437 0
 15434 -15435  15436  858 -15438 0
 15434 -15435  15436  858  15439 0

c  1-1 --> 0
c    (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0 ∧ -p_858) -> (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧ -b^{33, 27}_0)
c  in CNF:
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_2
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_1
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_0
c  in DIMACS:
 15434  15435 -15436  858 -15437 0
 15434  15435 -15436  858 -15438 0
 15434  15435 -15436  858 -15439 0

c  0-1 --> -1
c    (-b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧ -p_858) -> ( b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0)
c  in CNF:
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨  b^{33, 27}_2
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_1
c     b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨  b^{33, 27}_0
c  in DIMACS:
 15434  15435  15436  858  15437 0
 15434  15435  15436  858 -15438 0
 15434  15435  15436  858  15439 0

c  -1-1 --> -2
c    ( b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧  b^{33, 26}_0 ∧ -p_858) -> ( b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0)
c  in CNF:
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨  b^{33, 27}_2
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨  b^{33, 27}_1
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨  p_858 ∨ -b^{33, 27}_0
c  in DIMACS:
-15434  15435 -15436  858  15437 0
-15434  15435 -15436  858  15438 0
-15434  15435 -15436  858 -15439 0

c  -2-1 --> break 
c    ( b^{33, 26}_2 ∧  b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨  b^{33, 26}_0 ∨  p_858 ∨ break
c  in DIMACS:
-15434 -15435  15436  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 26}_2 ∧ -b^{33, 26}_1 ∧ -b^{33, 26}_0 ∧ true) 
c  in CNF:
c    -b^{33, 26}_2 ∨  b^{33, 26}_1 ∨  b^{33, 26}_0 ∨ false 
c  in DIMACS:
-15434  15435  15436  0

c  3 does not represent an automaton state.
c    -(-b^{33, 26}_2 ∧  b^{33, 26}_1 ∧  b^{33, 26}_0 ∧ true) 
c  in CNF:
c     b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ false 
c  in DIMACS:
 15434 -15435 -15436  0
c  -3 does not represent an automaton state.
c    -( b^{33, 26}_2 ∧  b^{33, 26}_1 ∧  b^{33, 26}_0 ∧ true) 
c  in CNF:
c    -b^{33, 26}_2 ∨ -b^{33, 26}_1 ∨ -b^{33, 26}_0 ∨ false 
c  in DIMACS:
-15434 -15435 -15436  0

c i = 27
c  -2+1 --> -1
c    ( b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧  p_891) -> ( b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0)
c  in CNF:
c    -b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨  b^{33, 28}_2
c    -b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_1
c    -b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨  b^{33, 28}_0
c  in DIMACS:
-15437 -15438  15439 -891  15440 0
-15437 -15438  15439 -891 -15441 0
-15437 -15438  15439 -891  15442 0

c  -1+1 --> 0
c    ( b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0 ∧  p_891) -> (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧ -b^{33, 28}_0)
c  in CNF:
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_2
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_1
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_0
c  in DIMACS:
-15437  15438 -15439 -891 -15440 0
-15437  15438 -15439 -891 -15441 0
-15437  15438 -15439 -891 -15442 0

c  0+1 --> 1
c    (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧  p_891) -> (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0)
c  in CNF:
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_2
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_1
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨  b^{33, 28}_0
c  in DIMACS:
 15437  15438  15439 -891 -15440 0
 15437  15438  15439 -891 -15441 0
 15437  15438  15439 -891  15442 0

c  1+1 --> 2
c    (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0 ∧  p_891) -> (-b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0)
c  in CNF:
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_2
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨  b^{33, 28}_1
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ -p_891 ∨ -b^{33, 28}_0
c  in DIMACS:
 15437  15438 -15439 -891 -15440 0
 15437  15438 -15439 -891  15441 0
 15437  15438 -15439 -891 -15442 0

c  2+1 --> break 
c    (-b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧  p_891) -> break
c  in CNF:
c     b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 15437 -15438  15439 -891 1162 0


c  2-1 --> 1
c    (-b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧ -p_891) -> (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0)
c  in CNF:
c     b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_2
c     b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_1
c     b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨  b^{33, 28}_0
c  in DIMACS:
 15437 -15438  15439  891 -15440 0
 15437 -15438  15439  891 -15441 0
 15437 -15438  15439  891  15442 0

c  1-1 --> 0
c    (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0 ∧ -p_891) -> (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧ -b^{33, 28}_0)
c  in CNF:
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_2
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_1
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_0
c  in DIMACS:
 15437  15438 -15439  891 -15440 0
 15437  15438 -15439  891 -15441 0
 15437  15438 -15439  891 -15442 0

c  0-1 --> -1
c    (-b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧ -p_891) -> ( b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0)
c  in CNF:
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨  b^{33, 28}_2
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_1
c     b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨  b^{33, 28}_0
c  in DIMACS:
 15437  15438  15439  891  15440 0
 15437  15438  15439  891 -15441 0
 15437  15438  15439  891  15442 0

c  -1-1 --> -2
c    ( b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧  b^{33, 27}_0 ∧ -p_891) -> ( b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0)
c  in CNF:
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨  b^{33, 28}_2
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨  b^{33, 28}_1
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨  p_891 ∨ -b^{33, 28}_0
c  in DIMACS:
-15437  15438 -15439  891  15440 0
-15437  15438 -15439  891  15441 0
-15437  15438 -15439  891 -15442 0

c  -2-1 --> break 
c    ( b^{33, 27}_2 ∧  b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨  b^{33, 27}_0 ∨  p_891 ∨ break
c  in DIMACS:
-15437 -15438  15439  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 27}_2 ∧ -b^{33, 27}_1 ∧ -b^{33, 27}_0 ∧ true) 
c  in CNF:
c    -b^{33, 27}_2 ∨  b^{33, 27}_1 ∨  b^{33, 27}_0 ∨ false 
c  in DIMACS:
-15437  15438  15439  0

c  3 does not represent an automaton state.
c    -(-b^{33, 27}_2 ∧  b^{33, 27}_1 ∧  b^{33, 27}_0 ∧ true) 
c  in CNF:
c     b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ false 
c  in DIMACS:
 15437 -15438 -15439  0
c  -3 does not represent an automaton state.
c    -( b^{33, 27}_2 ∧  b^{33, 27}_1 ∧  b^{33, 27}_0 ∧ true) 
c  in CNF:
c    -b^{33, 27}_2 ∨ -b^{33, 27}_1 ∨ -b^{33, 27}_0 ∨ false 
c  in DIMACS:
-15437 -15438 -15439  0

c i = 28
c  -2+1 --> -1
c    ( b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧  p_924) -> ( b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0)
c  in CNF:
c    -b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨  b^{33, 29}_2
c    -b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_1
c    -b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨  b^{33, 29}_0
c  in DIMACS:
-15440 -15441  15442 -924  15443 0
-15440 -15441  15442 -924 -15444 0
-15440 -15441  15442 -924  15445 0

c  -1+1 --> 0
c    ( b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0 ∧  p_924) -> (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧ -b^{33, 29}_0)
c  in CNF:
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_2
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_1
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_0
c  in DIMACS:
-15440  15441 -15442 -924 -15443 0
-15440  15441 -15442 -924 -15444 0
-15440  15441 -15442 -924 -15445 0

c  0+1 --> 1
c    (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧  p_924) -> (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0)
c  in CNF:
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_2
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_1
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨  b^{33, 29}_0
c  in DIMACS:
 15440  15441  15442 -924 -15443 0
 15440  15441  15442 -924 -15444 0
 15440  15441  15442 -924  15445 0

c  1+1 --> 2
c    (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0 ∧  p_924) -> (-b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0)
c  in CNF:
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_2
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨  b^{33, 29}_1
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ -p_924 ∨ -b^{33, 29}_0
c  in DIMACS:
 15440  15441 -15442 -924 -15443 0
 15440  15441 -15442 -924  15444 0
 15440  15441 -15442 -924 -15445 0

c  2+1 --> break 
c    (-b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧  p_924) -> break
c  in CNF:
c     b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 15440 -15441  15442 -924 1162 0


c  2-1 --> 1
c    (-b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧ -p_924) -> (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0)
c  in CNF:
c     b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_2
c     b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_1
c     b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨  b^{33, 29}_0
c  in DIMACS:
 15440 -15441  15442  924 -15443 0
 15440 -15441  15442  924 -15444 0
 15440 -15441  15442  924  15445 0

c  1-1 --> 0
c    (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0 ∧ -p_924) -> (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧ -b^{33, 29}_0)
c  in CNF:
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_2
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_1
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_0
c  in DIMACS:
 15440  15441 -15442  924 -15443 0
 15440  15441 -15442  924 -15444 0
 15440  15441 -15442  924 -15445 0

c  0-1 --> -1
c    (-b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧ -p_924) -> ( b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0)
c  in CNF:
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨  b^{33, 29}_2
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_1
c     b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨  b^{33, 29}_0
c  in DIMACS:
 15440  15441  15442  924  15443 0
 15440  15441  15442  924 -15444 0
 15440  15441  15442  924  15445 0

c  -1-1 --> -2
c    ( b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧  b^{33, 28}_0 ∧ -p_924) -> ( b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0)
c  in CNF:
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨  b^{33, 29}_2
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨  b^{33, 29}_1
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨  p_924 ∨ -b^{33, 29}_0
c  in DIMACS:
-15440  15441 -15442  924  15443 0
-15440  15441 -15442  924  15444 0
-15440  15441 -15442  924 -15445 0

c  -2-1 --> break 
c    ( b^{33, 28}_2 ∧  b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨  b^{33, 28}_0 ∨  p_924 ∨ break
c  in DIMACS:
-15440 -15441  15442  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 28}_2 ∧ -b^{33, 28}_1 ∧ -b^{33, 28}_0 ∧ true) 
c  in CNF:
c    -b^{33, 28}_2 ∨  b^{33, 28}_1 ∨  b^{33, 28}_0 ∨ false 
c  in DIMACS:
-15440  15441  15442  0

c  3 does not represent an automaton state.
c    -(-b^{33, 28}_2 ∧  b^{33, 28}_1 ∧  b^{33, 28}_0 ∧ true) 
c  in CNF:
c     b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ false 
c  in DIMACS:
 15440 -15441 -15442  0
c  -3 does not represent an automaton state.
c    -( b^{33, 28}_2 ∧  b^{33, 28}_1 ∧  b^{33, 28}_0 ∧ true) 
c  in CNF:
c    -b^{33, 28}_2 ∨ -b^{33, 28}_1 ∨ -b^{33, 28}_0 ∨ false 
c  in DIMACS:
-15440 -15441 -15442  0

c i = 29
c  -2+1 --> -1
c    ( b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧  p_957) -> ( b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0)
c  in CNF:
c    -b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨  b^{33, 30}_2
c    -b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_1
c    -b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨  b^{33, 30}_0
c  in DIMACS:
-15443 -15444  15445 -957  15446 0
-15443 -15444  15445 -957 -15447 0
-15443 -15444  15445 -957  15448 0

c  -1+1 --> 0
c    ( b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0 ∧  p_957) -> (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧ -b^{33, 30}_0)
c  in CNF:
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_2
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_1
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_0
c  in DIMACS:
-15443  15444 -15445 -957 -15446 0
-15443  15444 -15445 -957 -15447 0
-15443  15444 -15445 -957 -15448 0

c  0+1 --> 1
c    (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧  p_957) -> (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0)
c  in CNF:
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_2
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_1
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨  b^{33, 30}_0
c  in DIMACS:
 15443  15444  15445 -957 -15446 0
 15443  15444  15445 -957 -15447 0
 15443  15444  15445 -957  15448 0

c  1+1 --> 2
c    (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0 ∧  p_957) -> (-b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0)
c  in CNF:
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_2
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨  b^{33, 30}_1
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ -p_957 ∨ -b^{33, 30}_0
c  in DIMACS:
 15443  15444 -15445 -957 -15446 0
 15443  15444 -15445 -957  15447 0
 15443  15444 -15445 -957 -15448 0

c  2+1 --> break 
c    (-b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧  p_957) -> break
c  in CNF:
c     b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 15443 -15444  15445 -957 1162 0


c  2-1 --> 1
c    (-b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧ -p_957) -> (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0)
c  in CNF:
c     b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_2
c     b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_1
c     b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨  b^{33, 30}_0
c  in DIMACS:
 15443 -15444  15445  957 -15446 0
 15443 -15444  15445  957 -15447 0
 15443 -15444  15445  957  15448 0

c  1-1 --> 0
c    (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0 ∧ -p_957) -> (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧ -b^{33, 30}_0)
c  in CNF:
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_2
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_1
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_0
c  in DIMACS:
 15443  15444 -15445  957 -15446 0
 15443  15444 -15445  957 -15447 0
 15443  15444 -15445  957 -15448 0

c  0-1 --> -1
c    (-b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧ -p_957) -> ( b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0)
c  in CNF:
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨  b^{33, 30}_2
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_1
c     b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨  b^{33, 30}_0
c  in DIMACS:
 15443  15444  15445  957  15446 0
 15443  15444  15445  957 -15447 0
 15443  15444  15445  957  15448 0

c  -1-1 --> -2
c    ( b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧  b^{33, 29}_0 ∧ -p_957) -> ( b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0)
c  in CNF:
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨  b^{33, 30}_2
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨  b^{33, 30}_1
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨  p_957 ∨ -b^{33, 30}_0
c  in DIMACS:
-15443  15444 -15445  957  15446 0
-15443  15444 -15445  957  15447 0
-15443  15444 -15445  957 -15448 0

c  -2-1 --> break 
c    ( b^{33, 29}_2 ∧  b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨  b^{33, 29}_0 ∨  p_957 ∨ break
c  in DIMACS:
-15443 -15444  15445  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 29}_2 ∧ -b^{33, 29}_1 ∧ -b^{33, 29}_0 ∧ true) 
c  in CNF:
c    -b^{33, 29}_2 ∨  b^{33, 29}_1 ∨  b^{33, 29}_0 ∨ false 
c  in DIMACS:
-15443  15444  15445  0

c  3 does not represent an automaton state.
c    -(-b^{33, 29}_2 ∧  b^{33, 29}_1 ∧  b^{33, 29}_0 ∧ true) 
c  in CNF:
c     b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ false 
c  in DIMACS:
 15443 -15444 -15445  0
c  -3 does not represent an automaton state.
c    -( b^{33, 29}_2 ∧  b^{33, 29}_1 ∧  b^{33, 29}_0 ∧ true) 
c  in CNF:
c    -b^{33, 29}_2 ∨ -b^{33, 29}_1 ∨ -b^{33, 29}_0 ∨ false 
c  in DIMACS:
-15443 -15444 -15445  0

c i = 30
c  -2+1 --> -1
c    ( b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧  p_990) -> ( b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0)
c  in CNF:
c    -b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨  b^{33, 31}_2
c    -b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_1
c    -b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨  b^{33, 31}_0
c  in DIMACS:
-15446 -15447  15448 -990  15449 0
-15446 -15447  15448 -990 -15450 0
-15446 -15447  15448 -990  15451 0

c  -1+1 --> 0
c    ( b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0 ∧  p_990) -> (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧ -b^{33, 31}_0)
c  in CNF:
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_2
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_1
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_0
c  in DIMACS:
-15446  15447 -15448 -990 -15449 0
-15446  15447 -15448 -990 -15450 0
-15446  15447 -15448 -990 -15451 0

c  0+1 --> 1
c    (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧  p_990) -> (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0)
c  in CNF:
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_2
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_1
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨  b^{33, 31}_0
c  in DIMACS:
 15446  15447  15448 -990 -15449 0
 15446  15447  15448 -990 -15450 0
 15446  15447  15448 -990  15451 0

c  1+1 --> 2
c    (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0 ∧  p_990) -> (-b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0)
c  in CNF:
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_2
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨  b^{33, 31}_1
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ -p_990 ∨ -b^{33, 31}_0
c  in DIMACS:
 15446  15447 -15448 -990 -15449 0
 15446  15447 -15448 -990  15450 0
 15446  15447 -15448 -990 -15451 0

c  2+1 --> break 
c    (-b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧  p_990) -> break
c  in CNF:
c     b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 15446 -15447  15448 -990 1162 0


c  2-1 --> 1
c    (-b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧ -p_990) -> (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0)
c  in CNF:
c     b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_2
c     b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_1
c     b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨  b^{33, 31}_0
c  in DIMACS:
 15446 -15447  15448  990 -15449 0
 15446 -15447  15448  990 -15450 0
 15446 -15447  15448  990  15451 0

c  1-1 --> 0
c    (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0 ∧ -p_990) -> (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧ -b^{33, 31}_0)
c  in CNF:
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_2
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_1
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_0
c  in DIMACS:
 15446  15447 -15448  990 -15449 0
 15446  15447 -15448  990 -15450 0
 15446  15447 -15448  990 -15451 0

c  0-1 --> -1
c    (-b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧ -p_990) -> ( b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0)
c  in CNF:
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨  b^{33, 31}_2
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_1
c     b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨  b^{33, 31}_0
c  in DIMACS:
 15446  15447  15448  990  15449 0
 15446  15447  15448  990 -15450 0
 15446  15447  15448  990  15451 0

c  -1-1 --> -2
c    ( b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧  b^{33, 30}_0 ∧ -p_990) -> ( b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0)
c  in CNF:
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨  b^{33, 31}_2
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨  b^{33, 31}_1
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨  p_990 ∨ -b^{33, 31}_0
c  in DIMACS:
-15446  15447 -15448  990  15449 0
-15446  15447 -15448  990  15450 0
-15446  15447 -15448  990 -15451 0

c  -2-1 --> break 
c    ( b^{33, 30}_2 ∧  b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨  b^{33, 30}_0 ∨  p_990 ∨ break
c  in DIMACS:
-15446 -15447  15448  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 30}_2 ∧ -b^{33, 30}_1 ∧ -b^{33, 30}_0 ∧ true) 
c  in CNF:
c    -b^{33, 30}_2 ∨  b^{33, 30}_1 ∨  b^{33, 30}_0 ∨ false 
c  in DIMACS:
-15446  15447  15448  0

c  3 does not represent an automaton state.
c    -(-b^{33, 30}_2 ∧  b^{33, 30}_1 ∧  b^{33, 30}_0 ∧ true) 
c  in CNF:
c     b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ false 
c  in DIMACS:
 15446 -15447 -15448  0
c  -3 does not represent an automaton state.
c    -( b^{33, 30}_2 ∧  b^{33, 30}_1 ∧  b^{33, 30}_0 ∧ true) 
c  in CNF:
c    -b^{33, 30}_2 ∨ -b^{33, 30}_1 ∨ -b^{33, 30}_0 ∨ false 
c  in DIMACS:
-15446 -15447 -15448  0

c i = 31
c  -2+1 --> -1
c    ( b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧  p_1023) -> ( b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0)
c  in CNF:
c    -b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨  b^{33, 32}_2
c    -b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_1
c    -b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨  b^{33, 32}_0
c  in DIMACS:
-15449 -15450  15451 -1023  15452 0
-15449 -15450  15451 -1023 -15453 0
-15449 -15450  15451 -1023  15454 0

c  -1+1 --> 0
c    ( b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0 ∧  p_1023) -> (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧ -b^{33, 32}_0)
c  in CNF:
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_2
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_1
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_0
c  in DIMACS:
-15449  15450 -15451 -1023 -15452 0
-15449  15450 -15451 -1023 -15453 0
-15449  15450 -15451 -1023 -15454 0

c  0+1 --> 1
c    (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧  p_1023) -> (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0)
c  in CNF:
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_2
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_1
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨  b^{33, 32}_0
c  in DIMACS:
 15449  15450  15451 -1023 -15452 0
 15449  15450  15451 -1023 -15453 0
 15449  15450  15451 -1023  15454 0

c  1+1 --> 2
c    (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0 ∧  p_1023) -> (-b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0)
c  in CNF:
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_2
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨  b^{33, 32}_1
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ -p_1023 ∨ -b^{33, 32}_0
c  in DIMACS:
 15449  15450 -15451 -1023 -15452 0
 15449  15450 -15451 -1023  15453 0
 15449  15450 -15451 -1023 -15454 0

c  2+1 --> break 
c    (-b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 15449 -15450  15451 -1023 1162 0


c  2-1 --> 1
c    (-b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧ -p_1023) -> (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0)
c  in CNF:
c     b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_2
c     b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_1
c     b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨  b^{33, 32}_0
c  in DIMACS:
 15449 -15450  15451  1023 -15452 0
 15449 -15450  15451  1023 -15453 0
 15449 -15450  15451  1023  15454 0

c  1-1 --> 0
c    (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0 ∧ -p_1023) -> (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧ -b^{33, 32}_0)
c  in CNF:
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_2
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_1
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_0
c  in DIMACS:
 15449  15450 -15451  1023 -15452 0
 15449  15450 -15451  1023 -15453 0
 15449  15450 -15451  1023 -15454 0

c  0-1 --> -1
c    (-b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧ -p_1023) -> ( b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0)
c  in CNF:
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨  b^{33, 32}_2
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_1
c     b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨  b^{33, 32}_0
c  in DIMACS:
 15449  15450  15451  1023  15452 0
 15449  15450  15451  1023 -15453 0
 15449  15450  15451  1023  15454 0

c  -1-1 --> -2
c    ( b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧  b^{33, 31}_0 ∧ -p_1023) -> ( b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0)
c  in CNF:
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨  b^{33, 32}_2
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨  b^{33, 32}_1
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨  p_1023 ∨ -b^{33, 32}_0
c  in DIMACS:
-15449  15450 -15451  1023  15452 0
-15449  15450 -15451  1023  15453 0
-15449  15450 -15451  1023 -15454 0

c  -2-1 --> break 
c    ( b^{33, 31}_2 ∧  b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨  b^{33, 31}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-15449 -15450  15451  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 31}_2 ∧ -b^{33, 31}_1 ∧ -b^{33, 31}_0 ∧ true) 
c  in CNF:
c    -b^{33, 31}_2 ∨  b^{33, 31}_1 ∨  b^{33, 31}_0 ∨ false 
c  in DIMACS:
-15449  15450  15451  0

c  3 does not represent an automaton state.
c    -(-b^{33, 31}_2 ∧  b^{33, 31}_1 ∧  b^{33, 31}_0 ∧ true) 
c  in CNF:
c     b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ false 
c  in DIMACS:
 15449 -15450 -15451  0
c  -3 does not represent an automaton state.
c    -( b^{33, 31}_2 ∧  b^{33, 31}_1 ∧  b^{33, 31}_0 ∧ true) 
c  in CNF:
c    -b^{33, 31}_2 ∨ -b^{33, 31}_1 ∨ -b^{33, 31}_0 ∨ false 
c  in DIMACS:
-15449 -15450 -15451  0

c i = 32
c  -2+1 --> -1
c    ( b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧  p_1056) -> ( b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0)
c  in CNF:
c    -b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨  b^{33, 33}_2
c    -b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_1
c    -b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨  b^{33, 33}_0
c  in DIMACS:
-15452 -15453  15454 -1056  15455 0
-15452 -15453  15454 -1056 -15456 0
-15452 -15453  15454 -1056  15457 0

c  -1+1 --> 0
c    ( b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0 ∧  p_1056) -> (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧ -b^{33, 33}_0)
c  in CNF:
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_2
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_1
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_0
c  in DIMACS:
-15452  15453 -15454 -1056 -15455 0
-15452  15453 -15454 -1056 -15456 0
-15452  15453 -15454 -1056 -15457 0

c  0+1 --> 1
c    (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧  p_1056) -> (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0)
c  in CNF:
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_2
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_1
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨  b^{33, 33}_0
c  in DIMACS:
 15452  15453  15454 -1056 -15455 0
 15452  15453  15454 -1056 -15456 0
 15452  15453  15454 -1056  15457 0

c  1+1 --> 2
c    (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0 ∧  p_1056) -> (-b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0)
c  in CNF:
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_2
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨  b^{33, 33}_1
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ -p_1056 ∨ -b^{33, 33}_0
c  in DIMACS:
 15452  15453 -15454 -1056 -15455 0
 15452  15453 -15454 -1056  15456 0
 15452  15453 -15454 -1056 -15457 0

c  2+1 --> break 
c    (-b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 15452 -15453  15454 -1056 1162 0


c  2-1 --> 1
c    (-b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧ -p_1056) -> (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0)
c  in CNF:
c     b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_2
c     b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_1
c     b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨  b^{33, 33}_0
c  in DIMACS:
 15452 -15453  15454  1056 -15455 0
 15452 -15453  15454  1056 -15456 0
 15452 -15453  15454  1056  15457 0

c  1-1 --> 0
c    (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0 ∧ -p_1056) -> (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧ -b^{33, 33}_0)
c  in CNF:
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_2
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_1
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_0
c  in DIMACS:
 15452  15453 -15454  1056 -15455 0
 15452  15453 -15454  1056 -15456 0
 15452  15453 -15454  1056 -15457 0

c  0-1 --> -1
c    (-b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧ -p_1056) -> ( b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0)
c  in CNF:
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨  b^{33, 33}_2
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_1
c     b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨  b^{33, 33}_0
c  in DIMACS:
 15452  15453  15454  1056  15455 0
 15452  15453  15454  1056 -15456 0
 15452  15453  15454  1056  15457 0

c  -1-1 --> -2
c    ( b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧  b^{33, 32}_0 ∧ -p_1056) -> ( b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0)
c  in CNF:
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨  b^{33, 33}_2
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨  b^{33, 33}_1
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨  p_1056 ∨ -b^{33, 33}_0
c  in DIMACS:
-15452  15453 -15454  1056  15455 0
-15452  15453 -15454  1056  15456 0
-15452  15453 -15454  1056 -15457 0

c  -2-1 --> break 
c    ( b^{33, 32}_2 ∧  b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨  b^{33, 32}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-15452 -15453  15454  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 32}_2 ∧ -b^{33, 32}_1 ∧ -b^{33, 32}_0 ∧ true) 
c  in CNF:
c    -b^{33, 32}_2 ∨  b^{33, 32}_1 ∨  b^{33, 32}_0 ∨ false 
c  in DIMACS:
-15452  15453  15454  0

c  3 does not represent an automaton state.
c    -(-b^{33, 32}_2 ∧  b^{33, 32}_1 ∧  b^{33, 32}_0 ∧ true) 
c  in CNF:
c     b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ false 
c  in DIMACS:
 15452 -15453 -15454  0
c  -3 does not represent an automaton state.
c    -( b^{33, 32}_2 ∧  b^{33, 32}_1 ∧  b^{33, 32}_0 ∧ true) 
c  in CNF:
c    -b^{33, 32}_2 ∨ -b^{33, 32}_1 ∨ -b^{33, 32}_0 ∨ false 
c  in DIMACS:
-15452 -15453 -15454  0

c i = 33
c  -2+1 --> -1
c    ( b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧  p_1089) -> ( b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0)
c  in CNF:
c    -b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨  b^{33, 34}_2
c    -b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_1
c    -b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨  b^{33, 34}_0
c  in DIMACS:
-15455 -15456  15457 -1089  15458 0
-15455 -15456  15457 -1089 -15459 0
-15455 -15456  15457 -1089  15460 0

c  -1+1 --> 0
c    ( b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0 ∧  p_1089) -> (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧ -b^{33, 34}_0)
c  in CNF:
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_2
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_1
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_0
c  in DIMACS:
-15455  15456 -15457 -1089 -15458 0
-15455  15456 -15457 -1089 -15459 0
-15455  15456 -15457 -1089 -15460 0

c  0+1 --> 1
c    (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧  p_1089) -> (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0)
c  in CNF:
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_2
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_1
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨  b^{33, 34}_0
c  in DIMACS:
 15455  15456  15457 -1089 -15458 0
 15455  15456  15457 -1089 -15459 0
 15455  15456  15457 -1089  15460 0

c  1+1 --> 2
c    (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0 ∧  p_1089) -> (-b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0)
c  in CNF:
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_2
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨  b^{33, 34}_1
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ -p_1089 ∨ -b^{33, 34}_0
c  in DIMACS:
 15455  15456 -15457 -1089 -15458 0
 15455  15456 -15457 -1089  15459 0
 15455  15456 -15457 -1089 -15460 0

c  2+1 --> break 
c    (-b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 15455 -15456  15457 -1089 1162 0


c  2-1 --> 1
c    (-b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧ -p_1089) -> (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0)
c  in CNF:
c     b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_2
c     b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_1
c     b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨  b^{33, 34}_0
c  in DIMACS:
 15455 -15456  15457  1089 -15458 0
 15455 -15456  15457  1089 -15459 0
 15455 -15456  15457  1089  15460 0

c  1-1 --> 0
c    (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0 ∧ -p_1089) -> (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧ -b^{33, 34}_0)
c  in CNF:
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_2
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_1
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_0
c  in DIMACS:
 15455  15456 -15457  1089 -15458 0
 15455  15456 -15457  1089 -15459 0
 15455  15456 -15457  1089 -15460 0

c  0-1 --> -1
c    (-b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧ -p_1089) -> ( b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0)
c  in CNF:
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨  b^{33, 34}_2
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_1
c     b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨  b^{33, 34}_0
c  in DIMACS:
 15455  15456  15457  1089  15458 0
 15455  15456  15457  1089 -15459 0
 15455  15456  15457  1089  15460 0

c  -1-1 --> -2
c    ( b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧  b^{33, 33}_0 ∧ -p_1089) -> ( b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0)
c  in CNF:
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨  b^{33, 34}_2
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨  b^{33, 34}_1
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨  p_1089 ∨ -b^{33, 34}_0
c  in DIMACS:
-15455  15456 -15457  1089  15458 0
-15455  15456 -15457  1089  15459 0
-15455  15456 -15457  1089 -15460 0

c  -2-1 --> break 
c    ( b^{33, 33}_2 ∧  b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨  b^{33, 33}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-15455 -15456  15457  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 33}_2 ∧ -b^{33, 33}_1 ∧ -b^{33, 33}_0 ∧ true) 
c  in CNF:
c    -b^{33, 33}_2 ∨  b^{33, 33}_1 ∨  b^{33, 33}_0 ∨ false 
c  in DIMACS:
-15455  15456  15457  0

c  3 does not represent an automaton state.
c    -(-b^{33, 33}_2 ∧  b^{33, 33}_1 ∧  b^{33, 33}_0 ∧ true) 
c  in CNF:
c     b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ false 
c  in DIMACS:
 15455 -15456 -15457  0
c  -3 does not represent an automaton state.
c    -( b^{33, 33}_2 ∧  b^{33, 33}_1 ∧  b^{33, 33}_0 ∧ true) 
c  in CNF:
c    -b^{33, 33}_2 ∨ -b^{33, 33}_1 ∨ -b^{33, 33}_0 ∨ false 
c  in DIMACS:
-15455 -15456 -15457  0

c i = 34
c  -2+1 --> -1
c    ( b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧  p_1122) -> ( b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0)
c  in CNF:
c    -b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨  b^{33, 35}_2
c    -b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_1
c    -b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨  b^{33, 35}_0
c  in DIMACS:
-15458 -15459  15460 -1122  15461 0
-15458 -15459  15460 -1122 -15462 0
-15458 -15459  15460 -1122  15463 0

c  -1+1 --> 0
c    ( b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0 ∧  p_1122) -> (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧ -b^{33, 35}_0)
c  in CNF:
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_2
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_1
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_0
c  in DIMACS:
-15458  15459 -15460 -1122 -15461 0
-15458  15459 -15460 -1122 -15462 0
-15458  15459 -15460 -1122 -15463 0

c  0+1 --> 1
c    (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧  p_1122) -> (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0)
c  in CNF:
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_2
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_1
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨  b^{33, 35}_0
c  in DIMACS:
 15458  15459  15460 -1122 -15461 0
 15458  15459  15460 -1122 -15462 0
 15458  15459  15460 -1122  15463 0

c  1+1 --> 2
c    (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0 ∧  p_1122) -> (-b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0)
c  in CNF:
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_2
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨  b^{33, 35}_1
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ -p_1122 ∨ -b^{33, 35}_0
c  in DIMACS:
 15458  15459 -15460 -1122 -15461 0
 15458  15459 -15460 -1122  15462 0
 15458  15459 -15460 -1122 -15463 0

c  2+1 --> break 
c    (-b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 15458 -15459  15460 -1122 1162 0


c  2-1 --> 1
c    (-b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧ -p_1122) -> (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0)
c  in CNF:
c     b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_2
c     b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_1
c     b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨  b^{33, 35}_0
c  in DIMACS:
 15458 -15459  15460  1122 -15461 0
 15458 -15459  15460  1122 -15462 0
 15458 -15459  15460  1122  15463 0

c  1-1 --> 0
c    (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0 ∧ -p_1122) -> (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧ -b^{33, 35}_0)
c  in CNF:
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_2
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_1
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_0
c  in DIMACS:
 15458  15459 -15460  1122 -15461 0
 15458  15459 -15460  1122 -15462 0
 15458  15459 -15460  1122 -15463 0

c  0-1 --> -1
c    (-b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧ -p_1122) -> ( b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0)
c  in CNF:
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨  b^{33, 35}_2
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_1
c     b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨  b^{33, 35}_0
c  in DIMACS:
 15458  15459  15460  1122  15461 0
 15458  15459  15460  1122 -15462 0
 15458  15459  15460  1122  15463 0

c  -1-1 --> -2
c    ( b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧  b^{33, 34}_0 ∧ -p_1122) -> ( b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0)
c  in CNF:
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨  b^{33, 35}_2
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨  b^{33, 35}_1
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨  p_1122 ∨ -b^{33, 35}_0
c  in DIMACS:
-15458  15459 -15460  1122  15461 0
-15458  15459 -15460  1122  15462 0
-15458  15459 -15460  1122 -15463 0

c  -2-1 --> break 
c    ( b^{33, 34}_2 ∧  b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨  b^{33, 34}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-15458 -15459  15460  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 34}_2 ∧ -b^{33, 34}_1 ∧ -b^{33, 34}_0 ∧ true) 
c  in CNF:
c    -b^{33, 34}_2 ∨  b^{33, 34}_1 ∨  b^{33, 34}_0 ∨ false 
c  in DIMACS:
-15458  15459  15460  0

c  3 does not represent an automaton state.
c    -(-b^{33, 34}_2 ∧  b^{33, 34}_1 ∧  b^{33, 34}_0 ∧ true) 
c  in CNF:
c     b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ false 
c  in DIMACS:
 15458 -15459 -15460  0
c  -3 does not represent an automaton state.
c    -( b^{33, 34}_2 ∧  b^{33, 34}_1 ∧  b^{33, 34}_0 ∧ true) 
c  in CNF:
c    -b^{33, 34}_2 ∨ -b^{33, 34}_1 ∨ -b^{33, 34}_0 ∨ false 
c  in DIMACS:
-15458 -15459 -15460  0

c i = 35
c  -2+1 --> -1
c    ( b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧  p_1155) -> ( b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧  b^{33, 36}_0)
c  in CNF:
c    -b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨  b^{33, 36}_2
c    -b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_1
c    -b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨  b^{33, 36}_0
c  in DIMACS:
-15461 -15462  15463 -1155  15464 0
-15461 -15462  15463 -1155 -15465 0
-15461 -15462  15463 -1155  15466 0

c  -1+1 --> 0
c    ( b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0 ∧  p_1155) -> (-b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧ -b^{33, 36}_0)
c  in CNF:
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_2
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_1
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_0
c  in DIMACS:
-15461  15462 -15463 -1155 -15464 0
-15461  15462 -15463 -1155 -15465 0
-15461  15462 -15463 -1155 -15466 0

c  0+1 --> 1
c    (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧  p_1155) -> (-b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧  b^{33, 36}_0)
c  in CNF:
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_2
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_1
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨  b^{33, 36}_0
c  in DIMACS:
 15461  15462  15463 -1155 -15464 0
 15461  15462  15463 -1155 -15465 0
 15461  15462  15463 -1155  15466 0

c  1+1 --> 2
c    (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0 ∧  p_1155) -> (-b^{33, 36}_2 ∧  b^{33, 36}_1 ∧ -b^{33, 36}_0)
c  in CNF:
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_2
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨  b^{33, 36}_1
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ -p_1155 ∨ -b^{33, 36}_0
c  in DIMACS:
 15461  15462 -15463 -1155 -15464 0
 15461  15462 -15463 -1155  15465 0
 15461  15462 -15463 -1155 -15466 0

c  2+1 --> break 
c    (-b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 15461 -15462  15463 -1155 1162 0


c  2-1 --> 1
c    (-b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧ -p_1155) -> (-b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧  b^{33, 36}_0)
c  in CNF:
c     b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_2
c     b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_1
c     b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨  b^{33, 36}_0
c  in DIMACS:
 15461 -15462  15463  1155 -15464 0
 15461 -15462  15463  1155 -15465 0
 15461 -15462  15463  1155  15466 0

c  1-1 --> 0
c    (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0 ∧ -p_1155) -> (-b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧ -b^{33, 36}_0)
c  in CNF:
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_2
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_1
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_0
c  in DIMACS:
 15461  15462 -15463  1155 -15464 0
 15461  15462 -15463  1155 -15465 0
 15461  15462 -15463  1155 -15466 0

c  0-1 --> -1
c    (-b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧ -p_1155) -> ( b^{33, 36}_2 ∧ -b^{33, 36}_1 ∧  b^{33, 36}_0)
c  in CNF:
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨  b^{33, 36}_2
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_1
c     b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨  b^{33, 36}_0
c  in DIMACS:
 15461  15462  15463  1155  15464 0
 15461  15462  15463  1155 -15465 0
 15461  15462  15463  1155  15466 0

c  -1-1 --> -2
c    ( b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧  b^{33, 35}_0 ∧ -p_1155) -> ( b^{33, 36}_2 ∧  b^{33, 36}_1 ∧ -b^{33, 36}_0)
c  in CNF:
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨  b^{33, 36}_2
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨  b^{33, 36}_1
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨  p_1155 ∨ -b^{33, 36}_0
c  in DIMACS:
-15461  15462 -15463  1155  15464 0
-15461  15462 -15463  1155  15465 0
-15461  15462 -15463  1155 -15466 0

c  -2-1 --> break 
c    ( b^{33, 35}_2 ∧  b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨  b^{33, 35}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-15461 -15462  15463  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{33, 35}_2 ∧ -b^{33, 35}_1 ∧ -b^{33, 35}_0 ∧ true) 
c  in CNF:
c    -b^{33, 35}_2 ∨  b^{33, 35}_1 ∨  b^{33, 35}_0 ∨ false 
c  in DIMACS:
-15461  15462  15463  0

c  3 does not represent an automaton state.
c    -(-b^{33, 35}_2 ∧  b^{33, 35}_1 ∧  b^{33, 35}_0 ∧ true) 
c  in CNF:
c     b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ false 
c  in DIMACS:
 15461 -15462 -15463  0
c  -3 does not represent an automaton state.
c    -( b^{33, 35}_2 ∧  b^{33, 35}_1 ∧  b^{33, 35}_0 ∧ true) 
c  in CNF:
c    -b^{33, 35}_2 ∨ -b^{33, 35}_1 ∨ -b^{33, 35}_0 ∨ false 
c  in DIMACS:
-15461 -15462 -15463  0

c INIT for k = 34
c    -b^{34, 1}_2
c    -b^{34, 1}_1
c    -b^{34, 1}_0
c  in DIMACS:
-15467 0
-15468 0
-15469 0

c Transitions for k = 34
c i = 1
c  -2+1 --> -1
c    ( b^{34, 1}_2 ∧  b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧  p_34) -> ( b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0)
c  in CNF:
c    -b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨  b^{34, 2}_2
c    -b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_1
c    -b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨  b^{34, 2}_0
c  in DIMACS:
-15467 -15468  15469 -34  15470 0
-15467 -15468  15469 -34 -15471 0
-15467 -15468  15469 -34  15472 0

c  -1+1 --> 0
c    ( b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧  b^{34, 1}_0 ∧  p_34) -> (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧ -b^{34, 2}_0)
c  in CNF:
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_2
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_1
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_0
c  in DIMACS:
-15467  15468 -15469 -34 -15470 0
-15467  15468 -15469 -34 -15471 0
-15467  15468 -15469 -34 -15472 0

c  0+1 --> 1
c    (-b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧  p_34) -> (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0)
c  in CNF:
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_2
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_1
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨  b^{34, 2}_0
c  in DIMACS:
 15467  15468  15469 -34 -15470 0
 15467  15468  15469 -34 -15471 0
 15467  15468  15469 -34  15472 0

c  1+1 --> 2
c    (-b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧  b^{34, 1}_0 ∧  p_34) -> (-b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0)
c  in CNF:
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_2
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨  b^{34, 2}_1
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ -p_34 ∨ -b^{34, 2}_0
c  in DIMACS:
 15467  15468 -15469 -34 -15470 0
 15467  15468 -15469 -34  15471 0
 15467  15468 -15469 -34 -15472 0

c  2+1 --> break 
c    (-b^{34, 1}_2 ∧  b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧  p_34) -> break
c  in CNF:
c     b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ -p_34 ∨ break
c  in DIMACS:
 15467 -15468  15469 -34 1162 0


c  2-1 --> 1
c    (-b^{34, 1}_2 ∧  b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧ -p_34) -> (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0)
c  in CNF:
c     b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_2
c     b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_1
c     b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨  b^{34, 2}_0
c  in DIMACS:
 15467 -15468  15469  34 -15470 0
 15467 -15468  15469  34 -15471 0
 15467 -15468  15469  34  15472 0

c  1-1 --> 0
c    (-b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧  b^{34, 1}_0 ∧ -p_34) -> (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧ -b^{34, 2}_0)
c  in CNF:
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_2
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_1
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_0
c  in DIMACS:
 15467  15468 -15469  34 -15470 0
 15467  15468 -15469  34 -15471 0
 15467  15468 -15469  34 -15472 0

c  0-1 --> -1
c    (-b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧ -p_34) -> ( b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0)
c  in CNF:
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨  b^{34, 2}_2
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_1
c     b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨  b^{34, 2}_0
c  in DIMACS:
 15467  15468  15469  34  15470 0
 15467  15468  15469  34 -15471 0
 15467  15468  15469  34  15472 0

c  -1-1 --> -2
c    ( b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧  b^{34, 1}_0 ∧ -p_34) -> ( b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0)
c  in CNF:
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨  b^{34, 2}_2
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨  b^{34, 2}_1
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨  p_34 ∨ -b^{34, 2}_0
c  in DIMACS:
-15467  15468 -15469  34  15470 0
-15467  15468 -15469  34  15471 0
-15467  15468 -15469  34 -15472 0

c  -2-1 --> break 
c    ( b^{34, 1}_2 ∧  b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧ -p_34) -> break
c  in CNF:
c    -b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨  b^{34, 1}_0 ∨  p_34 ∨ break
c  in DIMACS:
-15467 -15468  15469  34 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 1}_2 ∧ -b^{34, 1}_1 ∧ -b^{34, 1}_0 ∧ true) 
c  in CNF:
c    -b^{34, 1}_2 ∨  b^{34, 1}_1 ∨  b^{34, 1}_0 ∨ false 
c  in DIMACS:
-15467  15468  15469  0

c  3 does not represent an automaton state.
c    -(-b^{34, 1}_2 ∧  b^{34, 1}_1 ∧  b^{34, 1}_0 ∧ true) 
c  in CNF:
c     b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ false 
c  in DIMACS:
 15467 -15468 -15469  0
c  -3 does not represent an automaton state.
c    -( b^{34, 1}_2 ∧  b^{34, 1}_1 ∧  b^{34, 1}_0 ∧ true) 
c  in CNF:
c    -b^{34, 1}_2 ∨ -b^{34, 1}_1 ∨ -b^{34, 1}_0 ∨ false 
c  in DIMACS:
-15467 -15468 -15469  0

c i = 2
c  -2+1 --> -1
c    ( b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧  p_68) -> ( b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0)
c  in CNF:
c    -b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨  b^{34, 3}_2
c    -b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_1
c    -b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨  b^{34, 3}_0
c  in DIMACS:
-15470 -15471  15472 -68  15473 0
-15470 -15471  15472 -68 -15474 0
-15470 -15471  15472 -68  15475 0

c  -1+1 --> 0
c    ( b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0 ∧  p_68) -> (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧ -b^{34, 3}_0)
c  in CNF:
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_2
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_1
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_0
c  in DIMACS:
-15470  15471 -15472 -68 -15473 0
-15470  15471 -15472 -68 -15474 0
-15470  15471 -15472 -68 -15475 0

c  0+1 --> 1
c    (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧  p_68) -> (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0)
c  in CNF:
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_2
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_1
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨  b^{34, 3}_0
c  in DIMACS:
 15470  15471  15472 -68 -15473 0
 15470  15471  15472 -68 -15474 0
 15470  15471  15472 -68  15475 0

c  1+1 --> 2
c    (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0 ∧  p_68) -> (-b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0)
c  in CNF:
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_2
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨  b^{34, 3}_1
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ -p_68 ∨ -b^{34, 3}_0
c  in DIMACS:
 15470  15471 -15472 -68 -15473 0
 15470  15471 -15472 -68  15474 0
 15470  15471 -15472 -68 -15475 0

c  2+1 --> break 
c    (-b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧  p_68) -> break
c  in CNF:
c     b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 15470 -15471  15472 -68 1162 0


c  2-1 --> 1
c    (-b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧ -p_68) -> (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0)
c  in CNF:
c     b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_2
c     b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_1
c     b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨  b^{34, 3}_0
c  in DIMACS:
 15470 -15471  15472  68 -15473 0
 15470 -15471  15472  68 -15474 0
 15470 -15471  15472  68  15475 0

c  1-1 --> 0
c    (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0 ∧ -p_68) -> (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧ -b^{34, 3}_0)
c  in CNF:
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_2
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_1
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_0
c  in DIMACS:
 15470  15471 -15472  68 -15473 0
 15470  15471 -15472  68 -15474 0
 15470  15471 -15472  68 -15475 0

c  0-1 --> -1
c    (-b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧ -p_68) -> ( b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0)
c  in CNF:
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨  b^{34, 3}_2
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_1
c     b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨  b^{34, 3}_0
c  in DIMACS:
 15470  15471  15472  68  15473 0
 15470  15471  15472  68 -15474 0
 15470  15471  15472  68  15475 0

c  -1-1 --> -2
c    ( b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧  b^{34, 2}_0 ∧ -p_68) -> ( b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0)
c  in CNF:
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨  b^{34, 3}_2
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨  b^{34, 3}_1
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨  p_68 ∨ -b^{34, 3}_0
c  in DIMACS:
-15470  15471 -15472  68  15473 0
-15470  15471 -15472  68  15474 0
-15470  15471 -15472  68 -15475 0

c  -2-1 --> break 
c    ( b^{34, 2}_2 ∧  b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨  b^{34, 2}_0 ∨  p_68 ∨ break
c  in DIMACS:
-15470 -15471  15472  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 2}_2 ∧ -b^{34, 2}_1 ∧ -b^{34, 2}_0 ∧ true) 
c  in CNF:
c    -b^{34, 2}_2 ∨  b^{34, 2}_1 ∨  b^{34, 2}_0 ∨ false 
c  in DIMACS:
-15470  15471  15472  0

c  3 does not represent an automaton state.
c    -(-b^{34, 2}_2 ∧  b^{34, 2}_1 ∧  b^{34, 2}_0 ∧ true) 
c  in CNF:
c     b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ false 
c  in DIMACS:
 15470 -15471 -15472  0
c  -3 does not represent an automaton state.
c    -( b^{34, 2}_2 ∧  b^{34, 2}_1 ∧  b^{34, 2}_0 ∧ true) 
c  in CNF:
c    -b^{34, 2}_2 ∨ -b^{34, 2}_1 ∨ -b^{34, 2}_0 ∨ false 
c  in DIMACS:
-15470 -15471 -15472  0

c i = 3
c  -2+1 --> -1
c    ( b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧  p_102) -> ( b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0)
c  in CNF:
c    -b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨  b^{34, 4}_2
c    -b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_1
c    -b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨  b^{34, 4}_0
c  in DIMACS:
-15473 -15474  15475 -102  15476 0
-15473 -15474  15475 -102 -15477 0
-15473 -15474  15475 -102  15478 0

c  -1+1 --> 0
c    ( b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0 ∧  p_102) -> (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧ -b^{34, 4}_0)
c  in CNF:
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_2
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_1
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_0
c  in DIMACS:
-15473  15474 -15475 -102 -15476 0
-15473  15474 -15475 -102 -15477 0
-15473  15474 -15475 -102 -15478 0

c  0+1 --> 1
c    (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧  p_102) -> (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0)
c  in CNF:
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_2
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_1
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨  b^{34, 4}_0
c  in DIMACS:
 15473  15474  15475 -102 -15476 0
 15473  15474  15475 -102 -15477 0
 15473  15474  15475 -102  15478 0

c  1+1 --> 2
c    (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0 ∧  p_102) -> (-b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0)
c  in CNF:
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_2
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨  b^{34, 4}_1
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ -p_102 ∨ -b^{34, 4}_0
c  in DIMACS:
 15473  15474 -15475 -102 -15476 0
 15473  15474 -15475 -102  15477 0
 15473  15474 -15475 -102 -15478 0

c  2+1 --> break 
c    (-b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧  p_102) -> break
c  in CNF:
c     b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 15473 -15474  15475 -102 1162 0


c  2-1 --> 1
c    (-b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧ -p_102) -> (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0)
c  in CNF:
c     b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_2
c     b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_1
c     b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨  b^{34, 4}_0
c  in DIMACS:
 15473 -15474  15475  102 -15476 0
 15473 -15474  15475  102 -15477 0
 15473 -15474  15475  102  15478 0

c  1-1 --> 0
c    (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0 ∧ -p_102) -> (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧ -b^{34, 4}_0)
c  in CNF:
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_2
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_1
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_0
c  in DIMACS:
 15473  15474 -15475  102 -15476 0
 15473  15474 -15475  102 -15477 0
 15473  15474 -15475  102 -15478 0

c  0-1 --> -1
c    (-b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧ -p_102) -> ( b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0)
c  in CNF:
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨  b^{34, 4}_2
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_1
c     b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨  b^{34, 4}_0
c  in DIMACS:
 15473  15474  15475  102  15476 0
 15473  15474  15475  102 -15477 0
 15473  15474  15475  102  15478 0

c  -1-1 --> -2
c    ( b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧  b^{34, 3}_0 ∧ -p_102) -> ( b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0)
c  in CNF:
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨  b^{34, 4}_2
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨  b^{34, 4}_1
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨  p_102 ∨ -b^{34, 4}_0
c  in DIMACS:
-15473  15474 -15475  102  15476 0
-15473  15474 -15475  102  15477 0
-15473  15474 -15475  102 -15478 0

c  -2-1 --> break 
c    ( b^{34, 3}_2 ∧  b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨  b^{34, 3}_0 ∨  p_102 ∨ break
c  in DIMACS:
-15473 -15474  15475  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 3}_2 ∧ -b^{34, 3}_1 ∧ -b^{34, 3}_0 ∧ true) 
c  in CNF:
c    -b^{34, 3}_2 ∨  b^{34, 3}_1 ∨  b^{34, 3}_0 ∨ false 
c  in DIMACS:
-15473  15474  15475  0

c  3 does not represent an automaton state.
c    -(-b^{34, 3}_2 ∧  b^{34, 3}_1 ∧  b^{34, 3}_0 ∧ true) 
c  in CNF:
c     b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ false 
c  in DIMACS:
 15473 -15474 -15475  0
c  -3 does not represent an automaton state.
c    -( b^{34, 3}_2 ∧  b^{34, 3}_1 ∧  b^{34, 3}_0 ∧ true) 
c  in CNF:
c    -b^{34, 3}_2 ∨ -b^{34, 3}_1 ∨ -b^{34, 3}_0 ∨ false 
c  in DIMACS:
-15473 -15474 -15475  0

c i = 4
c  -2+1 --> -1
c    ( b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧  p_136) -> ( b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0)
c  in CNF:
c    -b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨  b^{34, 5}_2
c    -b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_1
c    -b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨  b^{34, 5}_0
c  in DIMACS:
-15476 -15477  15478 -136  15479 0
-15476 -15477  15478 -136 -15480 0
-15476 -15477  15478 -136  15481 0

c  -1+1 --> 0
c    ( b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0 ∧  p_136) -> (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧ -b^{34, 5}_0)
c  in CNF:
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_2
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_1
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_0
c  in DIMACS:
-15476  15477 -15478 -136 -15479 0
-15476  15477 -15478 -136 -15480 0
-15476  15477 -15478 -136 -15481 0

c  0+1 --> 1
c    (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧  p_136) -> (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0)
c  in CNF:
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_2
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_1
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨  b^{34, 5}_0
c  in DIMACS:
 15476  15477  15478 -136 -15479 0
 15476  15477  15478 -136 -15480 0
 15476  15477  15478 -136  15481 0

c  1+1 --> 2
c    (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0 ∧  p_136) -> (-b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0)
c  in CNF:
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_2
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨  b^{34, 5}_1
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ -p_136 ∨ -b^{34, 5}_0
c  in DIMACS:
 15476  15477 -15478 -136 -15479 0
 15476  15477 -15478 -136  15480 0
 15476  15477 -15478 -136 -15481 0

c  2+1 --> break 
c    (-b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧  p_136) -> break
c  in CNF:
c     b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 15476 -15477  15478 -136 1162 0


c  2-1 --> 1
c    (-b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧ -p_136) -> (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0)
c  in CNF:
c     b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_2
c     b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_1
c     b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨  b^{34, 5}_0
c  in DIMACS:
 15476 -15477  15478  136 -15479 0
 15476 -15477  15478  136 -15480 0
 15476 -15477  15478  136  15481 0

c  1-1 --> 0
c    (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0 ∧ -p_136) -> (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧ -b^{34, 5}_0)
c  in CNF:
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_2
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_1
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_0
c  in DIMACS:
 15476  15477 -15478  136 -15479 0
 15476  15477 -15478  136 -15480 0
 15476  15477 -15478  136 -15481 0

c  0-1 --> -1
c    (-b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧ -p_136) -> ( b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0)
c  in CNF:
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨  b^{34, 5}_2
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_1
c     b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨  b^{34, 5}_0
c  in DIMACS:
 15476  15477  15478  136  15479 0
 15476  15477  15478  136 -15480 0
 15476  15477  15478  136  15481 0

c  -1-1 --> -2
c    ( b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧  b^{34, 4}_0 ∧ -p_136) -> ( b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0)
c  in CNF:
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨  b^{34, 5}_2
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨  b^{34, 5}_1
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨  p_136 ∨ -b^{34, 5}_0
c  in DIMACS:
-15476  15477 -15478  136  15479 0
-15476  15477 -15478  136  15480 0
-15476  15477 -15478  136 -15481 0

c  -2-1 --> break 
c    ( b^{34, 4}_2 ∧  b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨  b^{34, 4}_0 ∨  p_136 ∨ break
c  in DIMACS:
-15476 -15477  15478  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 4}_2 ∧ -b^{34, 4}_1 ∧ -b^{34, 4}_0 ∧ true) 
c  in CNF:
c    -b^{34, 4}_2 ∨  b^{34, 4}_1 ∨  b^{34, 4}_0 ∨ false 
c  in DIMACS:
-15476  15477  15478  0

c  3 does not represent an automaton state.
c    -(-b^{34, 4}_2 ∧  b^{34, 4}_1 ∧  b^{34, 4}_0 ∧ true) 
c  in CNF:
c     b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ false 
c  in DIMACS:
 15476 -15477 -15478  0
c  -3 does not represent an automaton state.
c    -( b^{34, 4}_2 ∧  b^{34, 4}_1 ∧  b^{34, 4}_0 ∧ true) 
c  in CNF:
c    -b^{34, 4}_2 ∨ -b^{34, 4}_1 ∨ -b^{34, 4}_0 ∨ false 
c  in DIMACS:
-15476 -15477 -15478  0

c i = 5
c  -2+1 --> -1
c    ( b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧  p_170) -> ( b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0)
c  in CNF:
c    -b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨  b^{34, 6}_2
c    -b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_1
c    -b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨  b^{34, 6}_0
c  in DIMACS:
-15479 -15480  15481 -170  15482 0
-15479 -15480  15481 -170 -15483 0
-15479 -15480  15481 -170  15484 0

c  -1+1 --> 0
c    ( b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0 ∧  p_170) -> (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧ -b^{34, 6}_0)
c  in CNF:
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_2
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_1
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_0
c  in DIMACS:
-15479  15480 -15481 -170 -15482 0
-15479  15480 -15481 -170 -15483 0
-15479  15480 -15481 -170 -15484 0

c  0+1 --> 1
c    (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧  p_170) -> (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0)
c  in CNF:
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_2
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_1
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨  b^{34, 6}_0
c  in DIMACS:
 15479  15480  15481 -170 -15482 0
 15479  15480  15481 -170 -15483 0
 15479  15480  15481 -170  15484 0

c  1+1 --> 2
c    (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0 ∧  p_170) -> (-b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0)
c  in CNF:
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_2
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨  b^{34, 6}_1
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ -p_170 ∨ -b^{34, 6}_0
c  in DIMACS:
 15479  15480 -15481 -170 -15482 0
 15479  15480 -15481 -170  15483 0
 15479  15480 -15481 -170 -15484 0

c  2+1 --> break 
c    (-b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧  p_170) -> break
c  in CNF:
c     b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 15479 -15480  15481 -170 1162 0


c  2-1 --> 1
c    (-b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧ -p_170) -> (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0)
c  in CNF:
c     b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_2
c     b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_1
c     b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨  b^{34, 6}_0
c  in DIMACS:
 15479 -15480  15481  170 -15482 0
 15479 -15480  15481  170 -15483 0
 15479 -15480  15481  170  15484 0

c  1-1 --> 0
c    (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0 ∧ -p_170) -> (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧ -b^{34, 6}_0)
c  in CNF:
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_2
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_1
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_0
c  in DIMACS:
 15479  15480 -15481  170 -15482 0
 15479  15480 -15481  170 -15483 0
 15479  15480 -15481  170 -15484 0

c  0-1 --> -1
c    (-b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧ -p_170) -> ( b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0)
c  in CNF:
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨  b^{34, 6}_2
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_1
c     b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨  b^{34, 6}_0
c  in DIMACS:
 15479  15480  15481  170  15482 0
 15479  15480  15481  170 -15483 0
 15479  15480  15481  170  15484 0

c  -1-1 --> -2
c    ( b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧  b^{34, 5}_0 ∧ -p_170) -> ( b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0)
c  in CNF:
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨  b^{34, 6}_2
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨  b^{34, 6}_1
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨  p_170 ∨ -b^{34, 6}_0
c  in DIMACS:
-15479  15480 -15481  170  15482 0
-15479  15480 -15481  170  15483 0
-15479  15480 -15481  170 -15484 0

c  -2-1 --> break 
c    ( b^{34, 5}_2 ∧  b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨  b^{34, 5}_0 ∨  p_170 ∨ break
c  in DIMACS:
-15479 -15480  15481  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 5}_2 ∧ -b^{34, 5}_1 ∧ -b^{34, 5}_0 ∧ true) 
c  in CNF:
c    -b^{34, 5}_2 ∨  b^{34, 5}_1 ∨  b^{34, 5}_0 ∨ false 
c  in DIMACS:
-15479  15480  15481  0

c  3 does not represent an automaton state.
c    -(-b^{34, 5}_2 ∧  b^{34, 5}_1 ∧  b^{34, 5}_0 ∧ true) 
c  in CNF:
c     b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ false 
c  in DIMACS:
 15479 -15480 -15481  0
c  -3 does not represent an automaton state.
c    -( b^{34, 5}_2 ∧  b^{34, 5}_1 ∧  b^{34, 5}_0 ∧ true) 
c  in CNF:
c    -b^{34, 5}_2 ∨ -b^{34, 5}_1 ∨ -b^{34, 5}_0 ∨ false 
c  in DIMACS:
-15479 -15480 -15481  0

c i = 6
c  -2+1 --> -1
c    ( b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧  p_204) -> ( b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0)
c  in CNF:
c    -b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨  b^{34, 7}_2
c    -b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_1
c    -b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨  b^{34, 7}_0
c  in DIMACS:
-15482 -15483  15484 -204  15485 0
-15482 -15483  15484 -204 -15486 0
-15482 -15483  15484 -204  15487 0

c  -1+1 --> 0
c    ( b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0 ∧  p_204) -> (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧ -b^{34, 7}_0)
c  in CNF:
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_2
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_1
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_0
c  in DIMACS:
-15482  15483 -15484 -204 -15485 0
-15482  15483 -15484 -204 -15486 0
-15482  15483 -15484 -204 -15487 0

c  0+1 --> 1
c    (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧  p_204) -> (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0)
c  in CNF:
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_2
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_1
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨  b^{34, 7}_0
c  in DIMACS:
 15482  15483  15484 -204 -15485 0
 15482  15483  15484 -204 -15486 0
 15482  15483  15484 -204  15487 0

c  1+1 --> 2
c    (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0 ∧  p_204) -> (-b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0)
c  in CNF:
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_2
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨  b^{34, 7}_1
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ -p_204 ∨ -b^{34, 7}_0
c  in DIMACS:
 15482  15483 -15484 -204 -15485 0
 15482  15483 -15484 -204  15486 0
 15482  15483 -15484 -204 -15487 0

c  2+1 --> break 
c    (-b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧  p_204) -> break
c  in CNF:
c     b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 15482 -15483  15484 -204 1162 0


c  2-1 --> 1
c    (-b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧ -p_204) -> (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0)
c  in CNF:
c     b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_2
c     b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_1
c     b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨  b^{34, 7}_0
c  in DIMACS:
 15482 -15483  15484  204 -15485 0
 15482 -15483  15484  204 -15486 0
 15482 -15483  15484  204  15487 0

c  1-1 --> 0
c    (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0 ∧ -p_204) -> (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧ -b^{34, 7}_0)
c  in CNF:
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_2
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_1
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_0
c  in DIMACS:
 15482  15483 -15484  204 -15485 0
 15482  15483 -15484  204 -15486 0
 15482  15483 -15484  204 -15487 0

c  0-1 --> -1
c    (-b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧ -p_204) -> ( b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0)
c  in CNF:
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨  b^{34, 7}_2
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_1
c     b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨  b^{34, 7}_0
c  in DIMACS:
 15482  15483  15484  204  15485 0
 15482  15483  15484  204 -15486 0
 15482  15483  15484  204  15487 0

c  -1-1 --> -2
c    ( b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧  b^{34, 6}_0 ∧ -p_204) -> ( b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0)
c  in CNF:
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨  b^{34, 7}_2
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨  b^{34, 7}_1
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨  p_204 ∨ -b^{34, 7}_0
c  in DIMACS:
-15482  15483 -15484  204  15485 0
-15482  15483 -15484  204  15486 0
-15482  15483 -15484  204 -15487 0

c  -2-1 --> break 
c    ( b^{34, 6}_2 ∧  b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨  b^{34, 6}_0 ∨  p_204 ∨ break
c  in DIMACS:
-15482 -15483  15484  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 6}_2 ∧ -b^{34, 6}_1 ∧ -b^{34, 6}_0 ∧ true) 
c  in CNF:
c    -b^{34, 6}_2 ∨  b^{34, 6}_1 ∨  b^{34, 6}_0 ∨ false 
c  in DIMACS:
-15482  15483  15484  0

c  3 does not represent an automaton state.
c    -(-b^{34, 6}_2 ∧  b^{34, 6}_1 ∧  b^{34, 6}_0 ∧ true) 
c  in CNF:
c     b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ false 
c  in DIMACS:
 15482 -15483 -15484  0
c  -3 does not represent an automaton state.
c    -( b^{34, 6}_2 ∧  b^{34, 6}_1 ∧  b^{34, 6}_0 ∧ true) 
c  in CNF:
c    -b^{34, 6}_2 ∨ -b^{34, 6}_1 ∨ -b^{34, 6}_0 ∨ false 
c  in DIMACS:
-15482 -15483 -15484  0

c i = 7
c  -2+1 --> -1
c    ( b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧  p_238) -> ( b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0)
c  in CNF:
c    -b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨  b^{34, 8}_2
c    -b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_1
c    -b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨  b^{34, 8}_0
c  in DIMACS:
-15485 -15486  15487 -238  15488 0
-15485 -15486  15487 -238 -15489 0
-15485 -15486  15487 -238  15490 0

c  -1+1 --> 0
c    ( b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0 ∧  p_238) -> (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧ -b^{34, 8}_0)
c  in CNF:
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_2
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_1
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_0
c  in DIMACS:
-15485  15486 -15487 -238 -15488 0
-15485  15486 -15487 -238 -15489 0
-15485  15486 -15487 -238 -15490 0

c  0+1 --> 1
c    (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧  p_238) -> (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0)
c  in CNF:
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_2
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_1
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨  b^{34, 8}_0
c  in DIMACS:
 15485  15486  15487 -238 -15488 0
 15485  15486  15487 -238 -15489 0
 15485  15486  15487 -238  15490 0

c  1+1 --> 2
c    (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0 ∧  p_238) -> (-b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0)
c  in CNF:
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_2
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨  b^{34, 8}_1
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ -p_238 ∨ -b^{34, 8}_0
c  in DIMACS:
 15485  15486 -15487 -238 -15488 0
 15485  15486 -15487 -238  15489 0
 15485  15486 -15487 -238 -15490 0

c  2+1 --> break 
c    (-b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧  p_238) -> break
c  in CNF:
c     b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 15485 -15486  15487 -238 1162 0


c  2-1 --> 1
c    (-b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧ -p_238) -> (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0)
c  in CNF:
c     b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_2
c     b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_1
c     b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨  b^{34, 8}_0
c  in DIMACS:
 15485 -15486  15487  238 -15488 0
 15485 -15486  15487  238 -15489 0
 15485 -15486  15487  238  15490 0

c  1-1 --> 0
c    (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0 ∧ -p_238) -> (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧ -b^{34, 8}_0)
c  in CNF:
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_2
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_1
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_0
c  in DIMACS:
 15485  15486 -15487  238 -15488 0
 15485  15486 -15487  238 -15489 0
 15485  15486 -15487  238 -15490 0

c  0-1 --> -1
c    (-b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧ -p_238) -> ( b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0)
c  in CNF:
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨  b^{34, 8}_2
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_1
c     b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨  b^{34, 8}_0
c  in DIMACS:
 15485  15486  15487  238  15488 0
 15485  15486  15487  238 -15489 0
 15485  15486  15487  238  15490 0

c  -1-1 --> -2
c    ( b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧  b^{34, 7}_0 ∧ -p_238) -> ( b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0)
c  in CNF:
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨  b^{34, 8}_2
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨  b^{34, 8}_1
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨  p_238 ∨ -b^{34, 8}_0
c  in DIMACS:
-15485  15486 -15487  238  15488 0
-15485  15486 -15487  238  15489 0
-15485  15486 -15487  238 -15490 0

c  -2-1 --> break 
c    ( b^{34, 7}_2 ∧  b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨  b^{34, 7}_0 ∨  p_238 ∨ break
c  in DIMACS:
-15485 -15486  15487  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 7}_2 ∧ -b^{34, 7}_1 ∧ -b^{34, 7}_0 ∧ true) 
c  in CNF:
c    -b^{34, 7}_2 ∨  b^{34, 7}_1 ∨  b^{34, 7}_0 ∨ false 
c  in DIMACS:
-15485  15486  15487  0

c  3 does not represent an automaton state.
c    -(-b^{34, 7}_2 ∧  b^{34, 7}_1 ∧  b^{34, 7}_0 ∧ true) 
c  in CNF:
c     b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ false 
c  in DIMACS:
 15485 -15486 -15487  0
c  -3 does not represent an automaton state.
c    -( b^{34, 7}_2 ∧  b^{34, 7}_1 ∧  b^{34, 7}_0 ∧ true) 
c  in CNF:
c    -b^{34, 7}_2 ∨ -b^{34, 7}_1 ∨ -b^{34, 7}_0 ∨ false 
c  in DIMACS:
-15485 -15486 -15487  0

c i = 8
c  -2+1 --> -1
c    ( b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧  p_272) -> ( b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0)
c  in CNF:
c    -b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨  b^{34, 9}_2
c    -b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_1
c    -b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨  b^{34, 9}_0
c  in DIMACS:
-15488 -15489  15490 -272  15491 0
-15488 -15489  15490 -272 -15492 0
-15488 -15489  15490 -272  15493 0

c  -1+1 --> 0
c    ( b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0 ∧  p_272) -> (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧ -b^{34, 9}_0)
c  in CNF:
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_2
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_1
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_0
c  in DIMACS:
-15488  15489 -15490 -272 -15491 0
-15488  15489 -15490 -272 -15492 0
-15488  15489 -15490 -272 -15493 0

c  0+1 --> 1
c    (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧  p_272) -> (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0)
c  in CNF:
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_2
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_1
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨  b^{34, 9}_0
c  in DIMACS:
 15488  15489  15490 -272 -15491 0
 15488  15489  15490 -272 -15492 0
 15488  15489  15490 -272  15493 0

c  1+1 --> 2
c    (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0 ∧  p_272) -> (-b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0)
c  in CNF:
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_2
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨  b^{34, 9}_1
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ -p_272 ∨ -b^{34, 9}_0
c  in DIMACS:
 15488  15489 -15490 -272 -15491 0
 15488  15489 -15490 -272  15492 0
 15488  15489 -15490 -272 -15493 0

c  2+1 --> break 
c    (-b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧  p_272) -> break
c  in CNF:
c     b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 15488 -15489  15490 -272 1162 0


c  2-1 --> 1
c    (-b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧ -p_272) -> (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0)
c  in CNF:
c     b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_2
c     b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_1
c     b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨  b^{34, 9}_0
c  in DIMACS:
 15488 -15489  15490  272 -15491 0
 15488 -15489  15490  272 -15492 0
 15488 -15489  15490  272  15493 0

c  1-1 --> 0
c    (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0 ∧ -p_272) -> (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧ -b^{34, 9}_0)
c  in CNF:
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_2
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_1
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_0
c  in DIMACS:
 15488  15489 -15490  272 -15491 0
 15488  15489 -15490  272 -15492 0
 15488  15489 -15490  272 -15493 0

c  0-1 --> -1
c    (-b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧ -p_272) -> ( b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0)
c  in CNF:
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨  b^{34, 9}_2
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_1
c     b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨  b^{34, 9}_0
c  in DIMACS:
 15488  15489  15490  272  15491 0
 15488  15489  15490  272 -15492 0
 15488  15489  15490  272  15493 0

c  -1-1 --> -2
c    ( b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧  b^{34, 8}_0 ∧ -p_272) -> ( b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0)
c  in CNF:
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨  b^{34, 9}_2
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨  b^{34, 9}_1
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨  p_272 ∨ -b^{34, 9}_0
c  in DIMACS:
-15488  15489 -15490  272  15491 0
-15488  15489 -15490  272  15492 0
-15488  15489 -15490  272 -15493 0

c  -2-1 --> break 
c    ( b^{34, 8}_2 ∧  b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨  b^{34, 8}_0 ∨  p_272 ∨ break
c  in DIMACS:
-15488 -15489  15490  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 8}_2 ∧ -b^{34, 8}_1 ∧ -b^{34, 8}_0 ∧ true) 
c  in CNF:
c    -b^{34, 8}_2 ∨  b^{34, 8}_1 ∨  b^{34, 8}_0 ∨ false 
c  in DIMACS:
-15488  15489  15490  0

c  3 does not represent an automaton state.
c    -(-b^{34, 8}_2 ∧  b^{34, 8}_1 ∧  b^{34, 8}_0 ∧ true) 
c  in CNF:
c     b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ false 
c  in DIMACS:
 15488 -15489 -15490  0
c  -3 does not represent an automaton state.
c    -( b^{34, 8}_2 ∧  b^{34, 8}_1 ∧  b^{34, 8}_0 ∧ true) 
c  in CNF:
c    -b^{34, 8}_2 ∨ -b^{34, 8}_1 ∨ -b^{34, 8}_0 ∨ false 
c  in DIMACS:
-15488 -15489 -15490  0

c i = 9
c  -2+1 --> -1
c    ( b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧  p_306) -> ( b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0)
c  in CNF:
c    -b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨  b^{34, 10}_2
c    -b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_1
c    -b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨  b^{34, 10}_0
c  in DIMACS:
-15491 -15492  15493 -306  15494 0
-15491 -15492  15493 -306 -15495 0
-15491 -15492  15493 -306  15496 0

c  -1+1 --> 0
c    ( b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0 ∧  p_306) -> (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧ -b^{34, 10}_0)
c  in CNF:
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_2
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_1
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_0
c  in DIMACS:
-15491  15492 -15493 -306 -15494 0
-15491  15492 -15493 -306 -15495 0
-15491  15492 -15493 -306 -15496 0

c  0+1 --> 1
c    (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧  p_306) -> (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0)
c  in CNF:
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_2
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_1
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨  b^{34, 10}_0
c  in DIMACS:
 15491  15492  15493 -306 -15494 0
 15491  15492  15493 -306 -15495 0
 15491  15492  15493 -306  15496 0

c  1+1 --> 2
c    (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0 ∧  p_306) -> (-b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0)
c  in CNF:
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_2
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨  b^{34, 10}_1
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ -p_306 ∨ -b^{34, 10}_0
c  in DIMACS:
 15491  15492 -15493 -306 -15494 0
 15491  15492 -15493 -306  15495 0
 15491  15492 -15493 -306 -15496 0

c  2+1 --> break 
c    (-b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧  p_306) -> break
c  in CNF:
c     b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 15491 -15492  15493 -306 1162 0


c  2-1 --> 1
c    (-b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧ -p_306) -> (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0)
c  in CNF:
c     b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_2
c     b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_1
c     b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨  b^{34, 10}_0
c  in DIMACS:
 15491 -15492  15493  306 -15494 0
 15491 -15492  15493  306 -15495 0
 15491 -15492  15493  306  15496 0

c  1-1 --> 0
c    (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0 ∧ -p_306) -> (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧ -b^{34, 10}_0)
c  in CNF:
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_2
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_1
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_0
c  in DIMACS:
 15491  15492 -15493  306 -15494 0
 15491  15492 -15493  306 -15495 0
 15491  15492 -15493  306 -15496 0

c  0-1 --> -1
c    (-b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧ -p_306) -> ( b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0)
c  in CNF:
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨  b^{34, 10}_2
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_1
c     b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨  b^{34, 10}_0
c  in DIMACS:
 15491  15492  15493  306  15494 0
 15491  15492  15493  306 -15495 0
 15491  15492  15493  306  15496 0

c  -1-1 --> -2
c    ( b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧  b^{34, 9}_0 ∧ -p_306) -> ( b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0)
c  in CNF:
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨  b^{34, 10}_2
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨  b^{34, 10}_1
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨  p_306 ∨ -b^{34, 10}_0
c  in DIMACS:
-15491  15492 -15493  306  15494 0
-15491  15492 -15493  306  15495 0
-15491  15492 -15493  306 -15496 0

c  -2-1 --> break 
c    ( b^{34, 9}_2 ∧  b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨  b^{34, 9}_0 ∨  p_306 ∨ break
c  in DIMACS:
-15491 -15492  15493  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 9}_2 ∧ -b^{34, 9}_1 ∧ -b^{34, 9}_0 ∧ true) 
c  in CNF:
c    -b^{34, 9}_2 ∨  b^{34, 9}_1 ∨  b^{34, 9}_0 ∨ false 
c  in DIMACS:
-15491  15492  15493  0

c  3 does not represent an automaton state.
c    -(-b^{34, 9}_2 ∧  b^{34, 9}_1 ∧  b^{34, 9}_0 ∧ true) 
c  in CNF:
c     b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ false 
c  in DIMACS:
 15491 -15492 -15493  0
c  -3 does not represent an automaton state.
c    -( b^{34, 9}_2 ∧  b^{34, 9}_1 ∧  b^{34, 9}_0 ∧ true) 
c  in CNF:
c    -b^{34, 9}_2 ∨ -b^{34, 9}_1 ∨ -b^{34, 9}_0 ∨ false 
c  in DIMACS:
-15491 -15492 -15493  0

c i = 10
c  -2+1 --> -1
c    ( b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧  p_340) -> ( b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0)
c  in CNF:
c    -b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨  b^{34, 11}_2
c    -b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_1
c    -b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨  b^{34, 11}_0
c  in DIMACS:
-15494 -15495  15496 -340  15497 0
-15494 -15495  15496 -340 -15498 0
-15494 -15495  15496 -340  15499 0

c  -1+1 --> 0
c    ( b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0 ∧  p_340) -> (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧ -b^{34, 11}_0)
c  in CNF:
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_2
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_1
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_0
c  in DIMACS:
-15494  15495 -15496 -340 -15497 0
-15494  15495 -15496 -340 -15498 0
-15494  15495 -15496 -340 -15499 0

c  0+1 --> 1
c    (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧  p_340) -> (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0)
c  in CNF:
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_2
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_1
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨  b^{34, 11}_0
c  in DIMACS:
 15494  15495  15496 -340 -15497 0
 15494  15495  15496 -340 -15498 0
 15494  15495  15496 -340  15499 0

c  1+1 --> 2
c    (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0 ∧  p_340) -> (-b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0)
c  in CNF:
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_2
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨  b^{34, 11}_1
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ -p_340 ∨ -b^{34, 11}_0
c  in DIMACS:
 15494  15495 -15496 -340 -15497 0
 15494  15495 -15496 -340  15498 0
 15494  15495 -15496 -340 -15499 0

c  2+1 --> break 
c    (-b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧  p_340) -> break
c  in CNF:
c     b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 15494 -15495  15496 -340 1162 0


c  2-1 --> 1
c    (-b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧ -p_340) -> (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0)
c  in CNF:
c     b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_2
c     b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_1
c     b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨  b^{34, 11}_0
c  in DIMACS:
 15494 -15495  15496  340 -15497 0
 15494 -15495  15496  340 -15498 0
 15494 -15495  15496  340  15499 0

c  1-1 --> 0
c    (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0 ∧ -p_340) -> (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧ -b^{34, 11}_0)
c  in CNF:
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_2
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_1
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_0
c  in DIMACS:
 15494  15495 -15496  340 -15497 0
 15494  15495 -15496  340 -15498 0
 15494  15495 -15496  340 -15499 0

c  0-1 --> -1
c    (-b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧ -p_340) -> ( b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0)
c  in CNF:
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨  b^{34, 11}_2
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_1
c     b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨  b^{34, 11}_0
c  in DIMACS:
 15494  15495  15496  340  15497 0
 15494  15495  15496  340 -15498 0
 15494  15495  15496  340  15499 0

c  -1-1 --> -2
c    ( b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧  b^{34, 10}_0 ∧ -p_340) -> ( b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0)
c  in CNF:
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨  b^{34, 11}_2
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨  b^{34, 11}_1
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨  p_340 ∨ -b^{34, 11}_0
c  in DIMACS:
-15494  15495 -15496  340  15497 0
-15494  15495 -15496  340  15498 0
-15494  15495 -15496  340 -15499 0

c  -2-1 --> break 
c    ( b^{34, 10}_2 ∧  b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨  b^{34, 10}_0 ∨  p_340 ∨ break
c  in DIMACS:
-15494 -15495  15496  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 10}_2 ∧ -b^{34, 10}_1 ∧ -b^{34, 10}_0 ∧ true) 
c  in CNF:
c    -b^{34, 10}_2 ∨  b^{34, 10}_1 ∨  b^{34, 10}_0 ∨ false 
c  in DIMACS:
-15494  15495  15496  0

c  3 does not represent an automaton state.
c    -(-b^{34, 10}_2 ∧  b^{34, 10}_1 ∧  b^{34, 10}_0 ∧ true) 
c  in CNF:
c     b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ false 
c  in DIMACS:
 15494 -15495 -15496  0
c  -3 does not represent an automaton state.
c    -( b^{34, 10}_2 ∧  b^{34, 10}_1 ∧  b^{34, 10}_0 ∧ true) 
c  in CNF:
c    -b^{34, 10}_2 ∨ -b^{34, 10}_1 ∨ -b^{34, 10}_0 ∨ false 
c  in DIMACS:
-15494 -15495 -15496  0

c i = 11
c  -2+1 --> -1
c    ( b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧  p_374) -> ( b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0)
c  in CNF:
c    -b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨  b^{34, 12}_2
c    -b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_1
c    -b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨  b^{34, 12}_0
c  in DIMACS:
-15497 -15498  15499 -374  15500 0
-15497 -15498  15499 -374 -15501 0
-15497 -15498  15499 -374  15502 0

c  -1+1 --> 0
c    ( b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0 ∧  p_374) -> (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧ -b^{34, 12}_0)
c  in CNF:
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_2
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_1
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_0
c  in DIMACS:
-15497  15498 -15499 -374 -15500 0
-15497  15498 -15499 -374 -15501 0
-15497  15498 -15499 -374 -15502 0

c  0+1 --> 1
c    (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧  p_374) -> (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0)
c  in CNF:
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_2
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_1
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨  b^{34, 12}_0
c  in DIMACS:
 15497  15498  15499 -374 -15500 0
 15497  15498  15499 -374 -15501 0
 15497  15498  15499 -374  15502 0

c  1+1 --> 2
c    (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0 ∧  p_374) -> (-b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0)
c  in CNF:
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_2
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨  b^{34, 12}_1
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ -p_374 ∨ -b^{34, 12}_0
c  in DIMACS:
 15497  15498 -15499 -374 -15500 0
 15497  15498 -15499 -374  15501 0
 15497  15498 -15499 -374 -15502 0

c  2+1 --> break 
c    (-b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧  p_374) -> break
c  in CNF:
c     b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 15497 -15498  15499 -374 1162 0


c  2-1 --> 1
c    (-b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧ -p_374) -> (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0)
c  in CNF:
c     b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_2
c     b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_1
c     b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨  b^{34, 12}_0
c  in DIMACS:
 15497 -15498  15499  374 -15500 0
 15497 -15498  15499  374 -15501 0
 15497 -15498  15499  374  15502 0

c  1-1 --> 0
c    (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0 ∧ -p_374) -> (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧ -b^{34, 12}_0)
c  in CNF:
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_2
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_1
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_0
c  in DIMACS:
 15497  15498 -15499  374 -15500 0
 15497  15498 -15499  374 -15501 0
 15497  15498 -15499  374 -15502 0

c  0-1 --> -1
c    (-b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧ -p_374) -> ( b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0)
c  in CNF:
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨  b^{34, 12}_2
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_1
c     b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨  b^{34, 12}_0
c  in DIMACS:
 15497  15498  15499  374  15500 0
 15497  15498  15499  374 -15501 0
 15497  15498  15499  374  15502 0

c  -1-1 --> -2
c    ( b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧  b^{34, 11}_0 ∧ -p_374) -> ( b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0)
c  in CNF:
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨  b^{34, 12}_2
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨  b^{34, 12}_1
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨  p_374 ∨ -b^{34, 12}_0
c  in DIMACS:
-15497  15498 -15499  374  15500 0
-15497  15498 -15499  374  15501 0
-15497  15498 -15499  374 -15502 0

c  -2-1 --> break 
c    ( b^{34, 11}_2 ∧  b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨  b^{34, 11}_0 ∨  p_374 ∨ break
c  in DIMACS:
-15497 -15498  15499  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 11}_2 ∧ -b^{34, 11}_1 ∧ -b^{34, 11}_0 ∧ true) 
c  in CNF:
c    -b^{34, 11}_2 ∨  b^{34, 11}_1 ∨  b^{34, 11}_0 ∨ false 
c  in DIMACS:
-15497  15498  15499  0

c  3 does not represent an automaton state.
c    -(-b^{34, 11}_2 ∧  b^{34, 11}_1 ∧  b^{34, 11}_0 ∧ true) 
c  in CNF:
c     b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ false 
c  in DIMACS:
 15497 -15498 -15499  0
c  -3 does not represent an automaton state.
c    -( b^{34, 11}_2 ∧  b^{34, 11}_1 ∧  b^{34, 11}_0 ∧ true) 
c  in CNF:
c    -b^{34, 11}_2 ∨ -b^{34, 11}_1 ∨ -b^{34, 11}_0 ∨ false 
c  in DIMACS:
-15497 -15498 -15499  0

c i = 12
c  -2+1 --> -1
c    ( b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧  p_408) -> ( b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0)
c  in CNF:
c    -b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨  b^{34, 13}_2
c    -b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_1
c    -b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨  b^{34, 13}_0
c  in DIMACS:
-15500 -15501  15502 -408  15503 0
-15500 -15501  15502 -408 -15504 0
-15500 -15501  15502 -408  15505 0

c  -1+1 --> 0
c    ( b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0 ∧  p_408) -> (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧ -b^{34, 13}_0)
c  in CNF:
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_2
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_1
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_0
c  in DIMACS:
-15500  15501 -15502 -408 -15503 0
-15500  15501 -15502 -408 -15504 0
-15500  15501 -15502 -408 -15505 0

c  0+1 --> 1
c    (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧  p_408) -> (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0)
c  in CNF:
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_2
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_1
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨  b^{34, 13}_0
c  in DIMACS:
 15500  15501  15502 -408 -15503 0
 15500  15501  15502 -408 -15504 0
 15500  15501  15502 -408  15505 0

c  1+1 --> 2
c    (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0 ∧  p_408) -> (-b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0)
c  in CNF:
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_2
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨  b^{34, 13}_1
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ -p_408 ∨ -b^{34, 13}_0
c  in DIMACS:
 15500  15501 -15502 -408 -15503 0
 15500  15501 -15502 -408  15504 0
 15500  15501 -15502 -408 -15505 0

c  2+1 --> break 
c    (-b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧  p_408) -> break
c  in CNF:
c     b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 15500 -15501  15502 -408 1162 0


c  2-1 --> 1
c    (-b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧ -p_408) -> (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0)
c  in CNF:
c     b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_2
c     b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_1
c     b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨  b^{34, 13}_0
c  in DIMACS:
 15500 -15501  15502  408 -15503 0
 15500 -15501  15502  408 -15504 0
 15500 -15501  15502  408  15505 0

c  1-1 --> 0
c    (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0 ∧ -p_408) -> (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧ -b^{34, 13}_0)
c  in CNF:
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_2
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_1
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_0
c  in DIMACS:
 15500  15501 -15502  408 -15503 0
 15500  15501 -15502  408 -15504 0
 15500  15501 -15502  408 -15505 0

c  0-1 --> -1
c    (-b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧ -p_408) -> ( b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0)
c  in CNF:
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨  b^{34, 13}_2
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_1
c     b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨  b^{34, 13}_0
c  in DIMACS:
 15500  15501  15502  408  15503 0
 15500  15501  15502  408 -15504 0
 15500  15501  15502  408  15505 0

c  -1-1 --> -2
c    ( b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧  b^{34, 12}_0 ∧ -p_408) -> ( b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0)
c  in CNF:
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨  b^{34, 13}_2
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨  b^{34, 13}_1
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨  p_408 ∨ -b^{34, 13}_0
c  in DIMACS:
-15500  15501 -15502  408  15503 0
-15500  15501 -15502  408  15504 0
-15500  15501 -15502  408 -15505 0

c  -2-1 --> break 
c    ( b^{34, 12}_2 ∧  b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨  b^{34, 12}_0 ∨  p_408 ∨ break
c  in DIMACS:
-15500 -15501  15502  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 12}_2 ∧ -b^{34, 12}_1 ∧ -b^{34, 12}_0 ∧ true) 
c  in CNF:
c    -b^{34, 12}_2 ∨  b^{34, 12}_1 ∨  b^{34, 12}_0 ∨ false 
c  in DIMACS:
-15500  15501  15502  0

c  3 does not represent an automaton state.
c    -(-b^{34, 12}_2 ∧  b^{34, 12}_1 ∧  b^{34, 12}_0 ∧ true) 
c  in CNF:
c     b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ false 
c  in DIMACS:
 15500 -15501 -15502  0
c  -3 does not represent an automaton state.
c    -( b^{34, 12}_2 ∧  b^{34, 12}_1 ∧  b^{34, 12}_0 ∧ true) 
c  in CNF:
c    -b^{34, 12}_2 ∨ -b^{34, 12}_1 ∨ -b^{34, 12}_0 ∨ false 
c  in DIMACS:
-15500 -15501 -15502  0

c i = 13
c  -2+1 --> -1
c    ( b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧  p_442) -> ( b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0)
c  in CNF:
c    -b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨  b^{34, 14}_2
c    -b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_1
c    -b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨  b^{34, 14}_0
c  in DIMACS:
-15503 -15504  15505 -442  15506 0
-15503 -15504  15505 -442 -15507 0
-15503 -15504  15505 -442  15508 0

c  -1+1 --> 0
c    ( b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0 ∧  p_442) -> (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧ -b^{34, 14}_0)
c  in CNF:
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_2
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_1
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_0
c  in DIMACS:
-15503  15504 -15505 -442 -15506 0
-15503  15504 -15505 -442 -15507 0
-15503  15504 -15505 -442 -15508 0

c  0+1 --> 1
c    (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧  p_442) -> (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0)
c  in CNF:
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_2
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_1
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨  b^{34, 14}_0
c  in DIMACS:
 15503  15504  15505 -442 -15506 0
 15503  15504  15505 -442 -15507 0
 15503  15504  15505 -442  15508 0

c  1+1 --> 2
c    (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0 ∧  p_442) -> (-b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0)
c  in CNF:
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_2
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨  b^{34, 14}_1
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ -p_442 ∨ -b^{34, 14}_0
c  in DIMACS:
 15503  15504 -15505 -442 -15506 0
 15503  15504 -15505 -442  15507 0
 15503  15504 -15505 -442 -15508 0

c  2+1 --> break 
c    (-b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧  p_442) -> break
c  in CNF:
c     b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 15503 -15504  15505 -442 1162 0


c  2-1 --> 1
c    (-b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧ -p_442) -> (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0)
c  in CNF:
c     b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_2
c     b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_1
c     b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨  b^{34, 14}_0
c  in DIMACS:
 15503 -15504  15505  442 -15506 0
 15503 -15504  15505  442 -15507 0
 15503 -15504  15505  442  15508 0

c  1-1 --> 0
c    (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0 ∧ -p_442) -> (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧ -b^{34, 14}_0)
c  in CNF:
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_2
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_1
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_0
c  in DIMACS:
 15503  15504 -15505  442 -15506 0
 15503  15504 -15505  442 -15507 0
 15503  15504 -15505  442 -15508 0

c  0-1 --> -1
c    (-b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧ -p_442) -> ( b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0)
c  in CNF:
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨  b^{34, 14}_2
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_1
c     b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨  b^{34, 14}_0
c  in DIMACS:
 15503  15504  15505  442  15506 0
 15503  15504  15505  442 -15507 0
 15503  15504  15505  442  15508 0

c  -1-1 --> -2
c    ( b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧  b^{34, 13}_0 ∧ -p_442) -> ( b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0)
c  in CNF:
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨  b^{34, 14}_2
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨  b^{34, 14}_1
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨  p_442 ∨ -b^{34, 14}_0
c  in DIMACS:
-15503  15504 -15505  442  15506 0
-15503  15504 -15505  442  15507 0
-15503  15504 -15505  442 -15508 0

c  -2-1 --> break 
c    ( b^{34, 13}_2 ∧  b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨  b^{34, 13}_0 ∨  p_442 ∨ break
c  in DIMACS:
-15503 -15504  15505  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 13}_2 ∧ -b^{34, 13}_1 ∧ -b^{34, 13}_0 ∧ true) 
c  in CNF:
c    -b^{34, 13}_2 ∨  b^{34, 13}_1 ∨  b^{34, 13}_0 ∨ false 
c  in DIMACS:
-15503  15504  15505  0

c  3 does not represent an automaton state.
c    -(-b^{34, 13}_2 ∧  b^{34, 13}_1 ∧  b^{34, 13}_0 ∧ true) 
c  in CNF:
c     b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ false 
c  in DIMACS:
 15503 -15504 -15505  0
c  -3 does not represent an automaton state.
c    -( b^{34, 13}_2 ∧  b^{34, 13}_1 ∧  b^{34, 13}_0 ∧ true) 
c  in CNF:
c    -b^{34, 13}_2 ∨ -b^{34, 13}_1 ∨ -b^{34, 13}_0 ∨ false 
c  in DIMACS:
-15503 -15504 -15505  0

c i = 14
c  -2+1 --> -1
c    ( b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧  p_476) -> ( b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0)
c  in CNF:
c    -b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨  b^{34, 15}_2
c    -b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_1
c    -b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨  b^{34, 15}_0
c  in DIMACS:
-15506 -15507  15508 -476  15509 0
-15506 -15507  15508 -476 -15510 0
-15506 -15507  15508 -476  15511 0

c  -1+1 --> 0
c    ( b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0 ∧  p_476) -> (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧ -b^{34, 15}_0)
c  in CNF:
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_2
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_1
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_0
c  in DIMACS:
-15506  15507 -15508 -476 -15509 0
-15506  15507 -15508 -476 -15510 0
-15506  15507 -15508 -476 -15511 0

c  0+1 --> 1
c    (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧  p_476) -> (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0)
c  in CNF:
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_2
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_1
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨  b^{34, 15}_0
c  in DIMACS:
 15506  15507  15508 -476 -15509 0
 15506  15507  15508 -476 -15510 0
 15506  15507  15508 -476  15511 0

c  1+1 --> 2
c    (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0 ∧  p_476) -> (-b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0)
c  in CNF:
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_2
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨  b^{34, 15}_1
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ -p_476 ∨ -b^{34, 15}_0
c  in DIMACS:
 15506  15507 -15508 -476 -15509 0
 15506  15507 -15508 -476  15510 0
 15506  15507 -15508 -476 -15511 0

c  2+1 --> break 
c    (-b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧  p_476) -> break
c  in CNF:
c     b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 15506 -15507  15508 -476 1162 0


c  2-1 --> 1
c    (-b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧ -p_476) -> (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0)
c  in CNF:
c     b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_2
c     b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_1
c     b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨  b^{34, 15}_0
c  in DIMACS:
 15506 -15507  15508  476 -15509 0
 15506 -15507  15508  476 -15510 0
 15506 -15507  15508  476  15511 0

c  1-1 --> 0
c    (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0 ∧ -p_476) -> (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧ -b^{34, 15}_0)
c  in CNF:
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_2
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_1
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_0
c  in DIMACS:
 15506  15507 -15508  476 -15509 0
 15506  15507 -15508  476 -15510 0
 15506  15507 -15508  476 -15511 0

c  0-1 --> -1
c    (-b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧ -p_476) -> ( b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0)
c  in CNF:
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨  b^{34, 15}_2
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_1
c     b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨  b^{34, 15}_0
c  in DIMACS:
 15506  15507  15508  476  15509 0
 15506  15507  15508  476 -15510 0
 15506  15507  15508  476  15511 0

c  -1-1 --> -2
c    ( b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧  b^{34, 14}_0 ∧ -p_476) -> ( b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0)
c  in CNF:
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨  b^{34, 15}_2
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨  b^{34, 15}_1
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨  p_476 ∨ -b^{34, 15}_0
c  in DIMACS:
-15506  15507 -15508  476  15509 0
-15506  15507 -15508  476  15510 0
-15506  15507 -15508  476 -15511 0

c  -2-1 --> break 
c    ( b^{34, 14}_2 ∧  b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨  b^{34, 14}_0 ∨  p_476 ∨ break
c  in DIMACS:
-15506 -15507  15508  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 14}_2 ∧ -b^{34, 14}_1 ∧ -b^{34, 14}_0 ∧ true) 
c  in CNF:
c    -b^{34, 14}_2 ∨  b^{34, 14}_1 ∨  b^{34, 14}_0 ∨ false 
c  in DIMACS:
-15506  15507  15508  0

c  3 does not represent an automaton state.
c    -(-b^{34, 14}_2 ∧  b^{34, 14}_1 ∧  b^{34, 14}_0 ∧ true) 
c  in CNF:
c     b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ false 
c  in DIMACS:
 15506 -15507 -15508  0
c  -3 does not represent an automaton state.
c    -( b^{34, 14}_2 ∧  b^{34, 14}_1 ∧  b^{34, 14}_0 ∧ true) 
c  in CNF:
c    -b^{34, 14}_2 ∨ -b^{34, 14}_1 ∨ -b^{34, 14}_0 ∨ false 
c  in DIMACS:
-15506 -15507 -15508  0

c i = 15
c  -2+1 --> -1
c    ( b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧  p_510) -> ( b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0)
c  in CNF:
c    -b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨  b^{34, 16}_2
c    -b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_1
c    -b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨  b^{34, 16}_0
c  in DIMACS:
-15509 -15510  15511 -510  15512 0
-15509 -15510  15511 -510 -15513 0
-15509 -15510  15511 -510  15514 0

c  -1+1 --> 0
c    ( b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0 ∧  p_510) -> (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧ -b^{34, 16}_0)
c  in CNF:
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_2
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_1
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_0
c  in DIMACS:
-15509  15510 -15511 -510 -15512 0
-15509  15510 -15511 -510 -15513 0
-15509  15510 -15511 -510 -15514 0

c  0+1 --> 1
c    (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧  p_510) -> (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0)
c  in CNF:
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_2
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_1
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨  b^{34, 16}_0
c  in DIMACS:
 15509  15510  15511 -510 -15512 0
 15509  15510  15511 -510 -15513 0
 15509  15510  15511 -510  15514 0

c  1+1 --> 2
c    (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0 ∧  p_510) -> (-b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0)
c  in CNF:
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_2
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨  b^{34, 16}_1
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ -p_510 ∨ -b^{34, 16}_0
c  in DIMACS:
 15509  15510 -15511 -510 -15512 0
 15509  15510 -15511 -510  15513 0
 15509  15510 -15511 -510 -15514 0

c  2+1 --> break 
c    (-b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧  p_510) -> break
c  in CNF:
c     b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 15509 -15510  15511 -510 1162 0


c  2-1 --> 1
c    (-b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧ -p_510) -> (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0)
c  in CNF:
c     b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_2
c     b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_1
c     b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨  b^{34, 16}_0
c  in DIMACS:
 15509 -15510  15511  510 -15512 0
 15509 -15510  15511  510 -15513 0
 15509 -15510  15511  510  15514 0

c  1-1 --> 0
c    (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0 ∧ -p_510) -> (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧ -b^{34, 16}_0)
c  in CNF:
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_2
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_1
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_0
c  in DIMACS:
 15509  15510 -15511  510 -15512 0
 15509  15510 -15511  510 -15513 0
 15509  15510 -15511  510 -15514 0

c  0-1 --> -1
c    (-b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧ -p_510) -> ( b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0)
c  in CNF:
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨  b^{34, 16}_2
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_1
c     b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨  b^{34, 16}_0
c  in DIMACS:
 15509  15510  15511  510  15512 0
 15509  15510  15511  510 -15513 0
 15509  15510  15511  510  15514 0

c  -1-1 --> -2
c    ( b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧  b^{34, 15}_0 ∧ -p_510) -> ( b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0)
c  in CNF:
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨  b^{34, 16}_2
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨  b^{34, 16}_1
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨  p_510 ∨ -b^{34, 16}_0
c  in DIMACS:
-15509  15510 -15511  510  15512 0
-15509  15510 -15511  510  15513 0
-15509  15510 -15511  510 -15514 0

c  -2-1 --> break 
c    ( b^{34, 15}_2 ∧  b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨  b^{34, 15}_0 ∨  p_510 ∨ break
c  in DIMACS:
-15509 -15510  15511  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 15}_2 ∧ -b^{34, 15}_1 ∧ -b^{34, 15}_0 ∧ true) 
c  in CNF:
c    -b^{34, 15}_2 ∨  b^{34, 15}_1 ∨  b^{34, 15}_0 ∨ false 
c  in DIMACS:
-15509  15510  15511  0

c  3 does not represent an automaton state.
c    -(-b^{34, 15}_2 ∧  b^{34, 15}_1 ∧  b^{34, 15}_0 ∧ true) 
c  in CNF:
c     b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ false 
c  in DIMACS:
 15509 -15510 -15511  0
c  -3 does not represent an automaton state.
c    -( b^{34, 15}_2 ∧  b^{34, 15}_1 ∧  b^{34, 15}_0 ∧ true) 
c  in CNF:
c    -b^{34, 15}_2 ∨ -b^{34, 15}_1 ∨ -b^{34, 15}_0 ∨ false 
c  in DIMACS:
-15509 -15510 -15511  0

c i = 16
c  -2+1 --> -1
c    ( b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧  p_544) -> ( b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0)
c  in CNF:
c    -b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨  b^{34, 17}_2
c    -b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_1
c    -b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨  b^{34, 17}_0
c  in DIMACS:
-15512 -15513  15514 -544  15515 0
-15512 -15513  15514 -544 -15516 0
-15512 -15513  15514 -544  15517 0

c  -1+1 --> 0
c    ( b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0 ∧  p_544) -> (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧ -b^{34, 17}_0)
c  in CNF:
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_2
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_1
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_0
c  in DIMACS:
-15512  15513 -15514 -544 -15515 0
-15512  15513 -15514 -544 -15516 0
-15512  15513 -15514 -544 -15517 0

c  0+1 --> 1
c    (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧  p_544) -> (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0)
c  in CNF:
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_2
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_1
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨  b^{34, 17}_0
c  in DIMACS:
 15512  15513  15514 -544 -15515 0
 15512  15513  15514 -544 -15516 0
 15512  15513  15514 -544  15517 0

c  1+1 --> 2
c    (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0 ∧  p_544) -> (-b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0)
c  in CNF:
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_2
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨  b^{34, 17}_1
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ -p_544 ∨ -b^{34, 17}_0
c  in DIMACS:
 15512  15513 -15514 -544 -15515 0
 15512  15513 -15514 -544  15516 0
 15512  15513 -15514 -544 -15517 0

c  2+1 --> break 
c    (-b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧  p_544) -> break
c  in CNF:
c     b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 15512 -15513  15514 -544 1162 0


c  2-1 --> 1
c    (-b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧ -p_544) -> (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0)
c  in CNF:
c     b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_2
c     b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_1
c     b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨  b^{34, 17}_0
c  in DIMACS:
 15512 -15513  15514  544 -15515 0
 15512 -15513  15514  544 -15516 0
 15512 -15513  15514  544  15517 0

c  1-1 --> 0
c    (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0 ∧ -p_544) -> (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧ -b^{34, 17}_0)
c  in CNF:
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_2
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_1
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_0
c  in DIMACS:
 15512  15513 -15514  544 -15515 0
 15512  15513 -15514  544 -15516 0
 15512  15513 -15514  544 -15517 0

c  0-1 --> -1
c    (-b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧ -p_544) -> ( b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0)
c  in CNF:
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨  b^{34, 17}_2
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_1
c     b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨  b^{34, 17}_0
c  in DIMACS:
 15512  15513  15514  544  15515 0
 15512  15513  15514  544 -15516 0
 15512  15513  15514  544  15517 0

c  -1-1 --> -2
c    ( b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧  b^{34, 16}_0 ∧ -p_544) -> ( b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0)
c  in CNF:
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨  b^{34, 17}_2
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨  b^{34, 17}_1
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨  p_544 ∨ -b^{34, 17}_0
c  in DIMACS:
-15512  15513 -15514  544  15515 0
-15512  15513 -15514  544  15516 0
-15512  15513 -15514  544 -15517 0

c  -2-1 --> break 
c    ( b^{34, 16}_2 ∧  b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨  b^{34, 16}_0 ∨  p_544 ∨ break
c  in DIMACS:
-15512 -15513  15514  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 16}_2 ∧ -b^{34, 16}_1 ∧ -b^{34, 16}_0 ∧ true) 
c  in CNF:
c    -b^{34, 16}_2 ∨  b^{34, 16}_1 ∨  b^{34, 16}_0 ∨ false 
c  in DIMACS:
-15512  15513  15514  0

c  3 does not represent an automaton state.
c    -(-b^{34, 16}_2 ∧  b^{34, 16}_1 ∧  b^{34, 16}_0 ∧ true) 
c  in CNF:
c     b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ false 
c  in DIMACS:
 15512 -15513 -15514  0
c  -3 does not represent an automaton state.
c    -( b^{34, 16}_2 ∧  b^{34, 16}_1 ∧  b^{34, 16}_0 ∧ true) 
c  in CNF:
c    -b^{34, 16}_2 ∨ -b^{34, 16}_1 ∨ -b^{34, 16}_0 ∨ false 
c  in DIMACS:
-15512 -15513 -15514  0

c i = 17
c  -2+1 --> -1
c    ( b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧  p_578) -> ( b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0)
c  in CNF:
c    -b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨  b^{34, 18}_2
c    -b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_1
c    -b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨  b^{34, 18}_0
c  in DIMACS:
-15515 -15516  15517 -578  15518 0
-15515 -15516  15517 -578 -15519 0
-15515 -15516  15517 -578  15520 0

c  -1+1 --> 0
c    ( b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0 ∧  p_578) -> (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧ -b^{34, 18}_0)
c  in CNF:
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_2
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_1
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_0
c  in DIMACS:
-15515  15516 -15517 -578 -15518 0
-15515  15516 -15517 -578 -15519 0
-15515  15516 -15517 -578 -15520 0

c  0+1 --> 1
c    (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧  p_578) -> (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0)
c  in CNF:
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_2
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_1
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨  b^{34, 18}_0
c  in DIMACS:
 15515  15516  15517 -578 -15518 0
 15515  15516  15517 -578 -15519 0
 15515  15516  15517 -578  15520 0

c  1+1 --> 2
c    (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0 ∧  p_578) -> (-b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0)
c  in CNF:
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_2
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨  b^{34, 18}_1
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ -p_578 ∨ -b^{34, 18}_0
c  in DIMACS:
 15515  15516 -15517 -578 -15518 0
 15515  15516 -15517 -578  15519 0
 15515  15516 -15517 -578 -15520 0

c  2+1 --> break 
c    (-b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧  p_578) -> break
c  in CNF:
c     b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ -p_578 ∨ break
c  in DIMACS:
 15515 -15516  15517 -578 1162 0


c  2-1 --> 1
c    (-b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧ -p_578) -> (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0)
c  in CNF:
c     b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_2
c     b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_1
c     b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨  b^{34, 18}_0
c  in DIMACS:
 15515 -15516  15517  578 -15518 0
 15515 -15516  15517  578 -15519 0
 15515 -15516  15517  578  15520 0

c  1-1 --> 0
c    (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0 ∧ -p_578) -> (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧ -b^{34, 18}_0)
c  in CNF:
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_2
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_1
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_0
c  in DIMACS:
 15515  15516 -15517  578 -15518 0
 15515  15516 -15517  578 -15519 0
 15515  15516 -15517  578 -15520 0

c  0-1 --> -1
c    (-b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧ -p_578) -> ( b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0)
c  in CNF:
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨  b^{34, 18}_2
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_1
c     b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨  b^{34, 18}_0
c  in DIMACS:
 15515  15516  15517  578  15518 0
 15515  15516  15517  578 -15519 0
 15515  15516  15517  578  15520 0

c  -1-1 --> -2
c    ( b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧  b^{34, 17}_0 ∧ -p_578) -> ( b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0)
c  in CNF:
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨  b^{34, 18}_2
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨  b^{34, 18}_1
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨  p_578 ∨ -b^{34, 18}_0
c  in DIMACS:
-15515  15516 -15517  578  15518 0
-15515  15516 -15517  578  15519 0
-15515  15516 -15517  578 -15520 0

c  -2-1 --> break 
c    ( b^{34, 17}_2 ∧  b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧ -p_578) -> break
c  in CNF:
c    -b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨  b^{34, 17}_0 ∨  p_578 ∨ break
c  in DIMACS:
-15515 -15516  15517  578 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 17}_2 ∧ -b^{34, 17}_1 ∧ -b^{34, 17}_0 ∧ true) 
c  in CNF:
c    -b^{34, 17}_2 ∨  b^{34, 17}_1 ∨  b^{34, 17}_0 ∨ false 
c  in DIMACS:
-15515  15516  15517  0

c  3 does not represent an automaton state.
c    -(-b^{34, 17}_2 ∧  b^{34, 17}_1 ∧  b^{34, 17}_0 ∧ true) 
c  in CNF:
c     b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ false 
c  in DIMACS:
 15515 -15516 -15517  0
c  -3 does not represent an automaton state.
c    -( b^{34, 17}_2 ∧  b^{34, 17}_1 ∧  b^{34, 17}_0 ∧ true) 
c  in CNF:
c    -b^{34, 17}_2 ∨ -b^{34, 17}_1 ∨ -b^{34, 17}_0 ∨ false 
c  in DIMACS:
-15515 -15516 -15517  0

c i = 18
c  -2+1 --> -1
c    ( b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧  p_612) -> ( b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0)
c  in CNF:
c    -b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨  b^{34, 19}_2
c    -b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_1
c    -b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨  b^{34, 19}_0
c  in DIMACS:
-15518 -15519  15520 -612  15521 0
-15518 -15519  15520 -612 -15522 0
-15518 -15519  15520 -612  15523 0

c  -1+1 --> 0
c    ( b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0 ∧  p_612) -> (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧ -b^{34, 19}_0)
c  in CNF:
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_2
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_1
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_0
c  in DIMACS:
-15518  15519 -15520 -612 -15521 0
-15518  15519 -15520 -612 -15522 0
-15518  15519 -15520 -612 -15523 0

c  0+1 --> 1
c    (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧  p_612) -> (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0)
c  in CNF:
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_2
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_1
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨  b^{34, 19}_0
c  in DIMACS:
 15518  15519  15520 -612 -15521 0
 15518  15519  15520 -612 -15522 0
 15518  15519  15520 -612  15523 0

c  1+1 --> 2
c    (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0 ∧  p_612) -> (-b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0)
c  in CNF:
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_2
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨  b^{34, 19}_1
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ -p_612 ∨ -b^{34, 19}_0
c  in DIMACS:
 15518  15519 -15520 -612 -15521 0
 15518  15519 -15520 -612  15522 0
 15518  15519 -15520 -612 -15523 0

c  2+1 --> break 
c    (-b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧  p_612) -> break
c  in CNF:
c     b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 15518 -15519  15520 -612 1162 0


c  2-1 --> 1
c    (-b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧ -p_612) -> (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0)
c  in CNF:
c     b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_2
c     b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_1
c     b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨  b^{34, 19}_0
c  in DIMACS:
 15518 -15519  15520  612 -15521 0
 15518 -15519  15520  612 -15522 0
 15518 -15519  15520  612  15523 0

c  1-1 --> 0
c    (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0 ∧ -p_612) -> (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧ -b^{34, 19}_0)
c  in CNF:
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_2
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_1
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_0
c  in DIMACS:
 15518  15519 -15520  612 -15521 0
 15518  15519 -15520  612 -15522 0
 15518  15519 -15520  612 -15523 0

c  0-1 --> -1
c    (-b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧ -p_612) -> ( b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0)
c  in CNF:
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨  b^{34, 19}_2
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_1
c     b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨  b^{34, 19}_0
c  in DIMACS:
 15518  15519  15520  612  15521 0
 15518  15519  15520  612 -15522 0
 15518  15519  15520  612  15523 0

c  -1-1 --> -2
c    ( b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧  b^{34, 18}_0 ∧ -p_612) -> ( b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0)
c  in CNF:
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨  b^{34, 19}_2
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨  b^{34, 19}_1
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨  p_612 ∨ -b^{34, 19}_0
c  in DIMACS:
-15518  15519 -15520  612  15521 0
-15518  15519 -15520  612  15522 0
-15518  15519 -15520  612 -15523 0

c  -2-1 --> break 
c    ( b^{34, 18}_2 ∧  b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨  b^{34, 18}_0 ∨  p_612 ∨ break
c  in DIMACS:
-15518 -15519  15520  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 18}_2 ∧ -b^{34, 18}_1 ∧ -b^{34, 18}_0 ∧ true) 
c  in CNF:
c    -b^{34, 18}_2 ∨  b^{34, 18}_1 ∨  b^{34, 18}_0 ∨ false 
c  in DIMACS:
-15518  15519  15520  0

c  3 does not represent an automaton state.
c    -(-b^{34, 18}_2 ∧  b^{34, 18}_1 ∧  b^{34, 18}_0 ∧ true) 
c  in CNF:
c     b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ false 
c  in DIMACS:
 15518 -15519 -15520  0
c  -3 does not represent an automaton state.
c    -( b^{34, 18}_2 ∧  b^{34, 18}_1 ∧  b^{34, 18}_0 ∧ true) 
c  in CNF:
c    -b^{34, 18}_2 ∨ -b^{34, 18}_1 ∨ -b^{34, 18}_0 ∨ false 
c  in DIMACS:
-15518 -15519 -15520  0

c i = 19
c  -2+1 --> -1
c    ( b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧  p_646) -> ( b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0)
c  in CNF:
c    -b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨  b^{34, 20}_2
c    -b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_1
c    -b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨  b^{34, 20}_0
c  in DIMACS:
-15521 -15522  15523 -646  15524 0
-15521 -15522  15523 -646 -15525 0
-15521 -15522  15523 -646  15526 0

c  -1+1 --> 0
c    ( b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0 ∧  p_646) -> (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧ -b^{34, 20}_0)
c  in CNF:
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_2
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_1
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_0
c  in DIMACS:
-15521  15522 -15523 -646 -15524 0
-15521  15522 -15523 -646 -15525 0
-15521  15522 -15523 -646 -15526 0

c  0+1 --> 1
c    (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧  p_646) -> (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0)
c  in CNF:
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_2
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_1
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨  b^{34, 20}_0
c  in DIMACS:
 15521  15522  15523 -646 -15524 0
 15521  15522  15523 -646 -15525 0
 15521  15522  15523 -646  15526 0

c  1+1 --> 2
c    (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0 ∧  p_646) -> (-b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0)
c  in CNF:
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_2
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨  b^{34, 20}_1
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ -p_646 ∨ -b^{34, 20}_0
c  in DIMACS:
 15521  15522 -15523 -646 -15524 0
 15521  15522 -15523 -646  15525 0
 15521  15522 -15523 -646 -15526 0

c  2+1 --> break 
c    (-b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧  p_646) -> break
c  in CNF:
c     b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 15521 -15522  15523 -646 1162 0


c  2-1 --> 1
c    (-b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧ -p_646) -> (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0)
c  in CNF:
c     b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_2
c     b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_1
c     b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨  b^{34, 20}_0
c  in DIMACS:
 15521 -15522  15523  646 -15524 0
 15521 -15522  15523  646 -15525 0
 15521 -15522  15523  646  15526 0

c  1-1 --> 0
c    (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0 ∧ -p_646) -> (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧ -b^{34, 20}_0)
c  in CNF:
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_2
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_1
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_0
c  in DIMACS:
 15521  15522 -15523  646 -15524 0
 15521  15522 -15523  646 -15525 0
 15521  15522 -15523  646 -15526 0

c  0-1 --> -1
c    (-b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧ -p_646) -> ( b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0)
c  in CNF:
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨  b^{34, 20}_2
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_1
c     b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨  b^{34, 20}_0
c  in DIMACS:
 15521  15522  15523  646  15524 0
 15521  15522  15523  646 -15525 0
 15521  15522  15523  646  15526 0

c  -1-1 --> -2
c    ( b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧  b^{34, 19}_0 ∧ -p_646) -> ( b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0)
c  in CNF:
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨  b^{34, 20}_2
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨  b^{34, 20}_1
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨  p_646 ∨ -b^{34, 20}_0
c  in DIMACS:
-15521  15522 -15523  646  15524 0
-15521  15522 -15523  646  15525 0
-15521  15522 -15523  646 -15526 0

c  -2-1 --> break 
c    ( b^{34, 19}_2 ∧  b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨  b^{34, 19}_0 ∨  p_646 ∨ break
c  in DIMACS:
-15521 -15522  15523  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 19}_2 ∧ -b^{34, 19}_1 ∧ -b^{34, 19}_0 ∧ true) 
c  in CNF:
c    -b^{34, 19}_2 ∨  b^{34, 19}_1 ∨  b^{34, 19}_0 ∨ false 
c  in DIMACS:
-15521  15522  15523  0

c  3 does not represent an automaton state.
c    -(-b^{34, 19}_2 ∧  b^{34, 19}_1 ∧  b^{34, 19}_0 ∧ true) 
c  in CNF:
c     b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ false 
c  in DIMACS:
 15521 -15522 -15523  0
c  -3 does not represent an automaton state.
c    -( b^{34, 19}_2 ∧  b^{34, 19}_1 ∧  b^{34, 19}_0 ∧ true) 
c  in CNF:
c    -b^{34, 19}_2 ∨ -b^{34, 19}_1 ∨ -b^{34, 19}_0 ∨ false 
c  in DIMACS:
-15521 -15522 -15523  0

c i = 20
c  -2+1 --> -1
c    ( b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧  p_680) -> ( b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0)
c  in CNF:
c    -b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨  b^{34, 21}_2
c    -b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_1
c    -b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨  b^{34, 21}_0
c  in DIMACS:
-15524 -15525  15526 -680  15527 0
-15524 -15525  15526 -680 -15528 0
-15524 -15525  15526 -680  15529 0

c  -1+1 --> 0
c    ( b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0 ∧  p_680) -> (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧ -b^{34, 21}_0)
c  in CNF:
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_2
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_1
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_0
c  in DIMACS:
-15524  15525 -15526 -680 -15527 0
-15524  15525 -15526 -680 -15528 0
-15524  15525 -15526 -680 -15529 0

c  0+1 --> 1
c    (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧  p_680) -> (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0)
c  in CNF:
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_2
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_1
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨  b^{34, 21}_0
c  in DIMACS:
 15524  15525  15526 -680 -15527 0
 15524  15525  15526 -680 -15528 0
 15524  15525  15526 -680  15529 0

c  1+1 --> 2
c    (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0 ∧  p_680) -> (-b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0)
c  in CNF:
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_2
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨  b^{34, 21}_1
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ -p_680 ∨ -b^{34, 21}_0
c  in DIMACS:
 15524  15525 -15526 -680 -15527 0
 15524  15525 -15526 -680  15528 0
 15524  15525 -15526 -680 -15529 0

c  2+1 --> break 
c    (-b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧  p_680) -> break
c  in CNF:
c     b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 15524 -15525  15526 -680 1162 0


c  2-1 --> 1
c    (-b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧ -p_680) -> (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0)
c  in CNF:
c     b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_2
c     b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_1
c     b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨  b^{34, 21}_0
c  in DIMACS:
 15524 -15525  15526  680 -15527 0
 15524 -15525  15526  680 -15528 0
 15524 -15525  15526  680  15529 0

c  1-1 --> 0
c    (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0 ∧ -p_680) -> (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧ -b^{34, 21}_0)
c  in CNF:
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_2
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_1
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_0
c  in DIMACS:
 15524  15525 -15526  680 -15527 0
 15524  15525 -15526  680 -15528 0
 15524  15525 -15526  680 -15529 0

c  0-1 --> -1
c    (-b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧ -p_680) -> ( b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0)
c  in CNF:
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨  b^{34, 21}_2
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_1
c     b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨  b^{34, 21}_0
c  in DIMACS:
 15524  15525  15526  680  15527 0
 15524  15525  15526  680 -15528 0
 15524  15525  15526  680  15529 0

c  -1-1 --> -2
c    ( b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧  b^{34, 20}_0 ∧ -p_680) -> ( b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0)
c  in CNF:
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨  b^{34, 21}_2
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨  b^{34, 21}_1
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨  p_680 ∨ -b^{34, 21}_0
c  in DIMACS:
-15524  15525 -15526  680  15527 0
-15524  15525 -15526  680  15528 0
-15524  15525 -15526  680 -15529 0

c  -2-1 --> break 
c    ( b^{34, 20}_2 ∧  b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨  b^{34, 20}_0 ∨  p_680 ∨ break
c  in DIMACS:
-15524 -15525  15526  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 20}_2 ∧ -b^{34, 20}_1 ∧ -b^{34, 20}_0 ∧ true) 
c  in CNF:
c    -b^{34, 20}_2 ∨  b^{34, 20}_1 ∨  b^{34, 20}_0 ∨ false 
c  in DIMACS:
-15524  15525  15526  0

c  3 does not represent an automaton state.
c    -(-b^{34, 20}_2 ∧  b^{34, 20}_1 ∧  b^{34, 20}_0 ∧ true) 
c  in CNF:
c     b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ false 
c  in DIMACS:
 15524 -15525 -15526  0
c  -3 does not represent an automaton state.
c    -( b^{34, 20}_2 ∧  b^{34, 20}_1 ∧  b^{34, 20}_0 ∧ true) 
c  in CNF:
c    -b^{34, 20}_2 ∨ -b^{34, 20}_1 ∨ -b^{34, 20}_0 ∨ false 
c  in DIMACS:
-15524 -15525 -15526  0

c i = 21
c  -2+1 --> -1
c    ( b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧  p_714) -> ( b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0)
c  in CNF:
c    -b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨  b^{34, 22}_2
c    -b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_1
c    -b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨  b^{34, 22}_0
c  in DIMACS:
-15527 -15528  15529 -714  15530 0
-15527 -15528  15529 -714 -15531 0
-15527 -15528  15529 -714  15532 0

c  -1+1 --> 0
c    ( b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0 ∧  p_714) -> (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧ -b^{34, 22}_0)
c  in CNF:
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_2
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_1
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_0
c  in DIMACS:
-15527  15528 -15529 -714 -15530 0
-15527  15528 -15529 -714 -15531 0
-15527  15528 -15529 -714 -15532 0

c  0+1 --> 1
c    (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧  p_714) -> (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0)
c  in CNF:
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_2
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_1
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨  b^{34, 22}_0
c  in DIMACS:
 15527  15528  15529 -714 -15530 0
 15527  15528  15529 -714 -15531 0
 15527  15528  15529 -714  15532 0

c  1+1 --> 2
c    (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0 ∧  p_714) -> (-b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0)
c  in CNF:
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_2
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨  b^{34, 22}_1
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ -p_714 ∨ -b^{34, 22}_0
c  in DIMACS:
 15527  15528 -15529 -714 -15530 0
 15527  15528 -15529 -714  15531 0
 15527  15528 -15529 -714 -15532 0

c  2+1 --> break 
c    (-b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧  p_714) -> break
c  in CNF:
c     b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 15527 -15528  15529 -714 1162 0


c  2-1 --> 1
c    (-b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧ -p_714) -> (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0)
c  in CNF:
c     b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_2
c     b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_1
c     b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨  b^{34, 22}_0
c  in DIMACS:
 15527 -15528  15529  714 -15530 0
 15527 -15528  15529  714 -15531 0
 15527 -15528  15529  714  15532 0

c  1-1 --> 0
c    (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0 ∧ -p_714) -> (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧ -b^{34, 22}_0)
c  in CNF:
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_2
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_1
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_0
c  in DIMACS:
 15527  15528 -15529  714 -15530 0
 15527  15528 -15529  714 -15531 0
 15527  15528 -15529  714 -15532 0

c  0-1 --> -1
c    (-b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧ -p_714) -> ( b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0)
c  in CNF:
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨  b^{34, 22}_2
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_1
c     b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨  b^{34, 22}_0
c  in DIMACS:
 15527  15528  15529  714  15530 0
 15527  15528  15529  714 -15531 0
 15527  15528  15529  714  15532 0

c  -1-1 --> -2
c    ( b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧  b^{34, 21}_0 ∧ -p_714) -> ( b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0)
c  in CNF:
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨  b^{34, 22}_2
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨  b^{34, 22}_1
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨  p_714 ∨ -b^{34, 22}_0
c  in DIMACS:
-15527  15528 -15529  714  15530 0
-15527  15528 -15529  714  15531 0
-15527  15528 -15529  714 -15532 0

c  -2-1 --> break 
c    ( b^{34, 21}_2 ∧  b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨  b^{34, 21}_0 ∨  p_714 ∨ break
c  in DIMACS:
-15527 -15528  15529  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 21}_2 ∧ -b^{34, 21}_1 ∧ -b^{34, 21}_0 ∧ true) 
c  in CNF:
c    -b^{34, 21}_2 ∨  b^{34, 21}_1 ∨  b^{34, 21}_0 ∨ false 
c  in DIMACS:
-15527  15528  15529  0

c  3 does not represent an automaton state.
c    -(-b^{34, 21}_2 ∧  b^{34, 21}_1 ∧  b^{34, 21}_0 ∧ true) 
c  in CNF:
c     b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ false 
c  in DIMACS:
 15527 -15528 -15529  0
c  -3 does not represent an automaton state.
c    -( b^{34, 21}_2 ∧  b^{34, 21}_1 ∧  b^{34, 21}_0 ∧ true) 
c  in CNF:
c    -b^{34, 21}_2 ∨ -b^{34, 21}_1 ∨ -b^{34, 21}_0 ∨ false 
c  in DIMACS:
-15527 -15528 -15529  0

c i = 22
c  -2+1 --> -1
c    ( b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧  p_748) -> ( b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0)
c  in CNF:
c    -b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨  b^{34, 23}_2
c    -b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_1
c    -b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨  b^{34, 23}_0
c  in DIMACS:
-15530 -15531  15532 -748  15533 0
-15530 -15531  15532 -748 -15534 0
-15530 -15531  15532 -748  15535 0

c  -1+1 --> 0
c    ( b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0 ∧  p_748) -> (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧ -b^{34, 23}_0)
c  in CNF:
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_2
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_1
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_0
c  in DIMACS:
-15530  15531 -15532 -748 -15533 0
-15530  15531 -15532 -748 -15534 0
-15530  15531 -15532 -748 -15535 0

c  0+1 --> 1
c    (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧  p_748) -> (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0)
c  in CNF:
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_2
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_1
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨  b^{34, 23}_0
c  in DIMACS:
 15530  15531  15532 -748 -15533 0
 15530  15531  15532 -748 -15534 0
 15530  15531  15532 -748  15535 0

c  1+1 --> 2
c    (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0 ∧  p_748) -> (-b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0)
c  in CNF:
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_2
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨  b^{34, 23}_1
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ -p_748 ∨ -b^{34, 23}_0
c  in DIMACS:
 15530  15531 -15532 -748 -15533 0
 15530  15531 -15532 -748  15534 0
 15530  15531 -15532 -748 -15535 0

c  2+1 --> break 
c    (-b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧  p_748) -> break
c  in CNF:
c     b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 15530 -15531  15532 -748 1162 0


c  2-1 --> 1
c    (-b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧ -p_748) -> (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0)
c  in CNF:
c     b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_2
c     b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_1
c     b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨  b^{34, 23}_0
c  in DIMACS:
 15530 -15531  15532  748 -15533 0
 15530 -15531  15532  748 -15534 0
 15530 -15531  15532  748  15535 0

c  1-1 --> 0
c    (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0 ∧ -p_748) -> (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧ -b^{34, 23}_0)
c  in CNF:
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_2
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_1
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_0
c  in DIMACS:
 15530  15531 -15532  748 -15533 0
 15530  15531 -15532  748 -15534 0
 15530  15531 -15532  748 -15535 0

c  0-1 --> -1
c    (-b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧ -p_748) -> ( b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0)
c  in CNF:
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨  b^{34, 23}_2
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_1
c     b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨  b^{34, 23}_0
c  in DIMACS:
 15530  15531  15532  748  15533 0
 15530  15531  15532  748 -15534 0
 15530  15531  15532  748  15535 0

c  -1-1 --> -2
c    ( b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧  b^{34, 22}_0 ∧ -p_748) -> ( b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0)
c  in CNF:
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨  b^{34, 23}_2
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨  b^{34, 23}_1
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨  p_748 ∨ -b^{34, 23}_0
c  in DIMACS:
-15530  15531 -15532  748  15533 0
-15530  15531 -15532  748  15534 0
-15530  15531 -15532  748 -15535 0

c  -2-1 --> break 
c    ( b^{34, 22}_2 ∧  b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨  b^{34, 22}_0 ∨  p_748 ∨ break
c  in DIMACS:
-15530 -15531  15532  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 22}_2 ∧ -b^{34, 22}_1 ∧ -b^{34, 22}_0 ∧ true) 
c  in CNF:
c    -b^{34, 22}_2 ∨  b^{34, 22}_1 ∨  b^{34, 22}_0 ∨ false 
c  in DIMACS:
-15530  15531  15532  0

c  3 does not represent an automaton state.
c    -(-b^{34, 22}_2 ∧  b^{34, 22}_1 ∧  b^{34, 22}_0 ∧ true) 
c  in CNF:
c     b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ false 
c  in DIMACS:
 15530 -15531 -15532  0
c  -3 does not represent an automaton state.
c    -( b^{34, 22}_2 ∧  b^{34, 22}_1 ∧  b^{34, 22}_0 ∧ true) 
c  in CNF:
c    -b^{34, 22}_2 ∨ -b^{34, 22}_1 ∨ -b^{34, 22}_0 ∨ false 
c  in DIMACS:
-15530 -15531 -15532  0

c i = 23
c  -2+1 --> -1
c    ( b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧  p_782) -> ( b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0)
c  in CNF:
c    -b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨  b^{34, 24}_2
c    -b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_1
c    -b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨  b^{34, 24}_0
c  in DIMACS:
-15533 -15534  15535 -782  15536 0
-15533 -15534  15535 -782 -15537 0
-15533 -15534  15535 -782  15538 0

c  -1+1 --> 0
c    ( b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0 ∧  p_782) -> (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧ -b^{34, 24}_0)
c  in CNF:
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_2
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_1
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_0
c  in DIMACS:
-15533  15534 -15535 -782 -15536 0
-15533  15534 -15535 -782 -15537 0
-15533  15534 -15535 -782 -15538 0

c  0+1 --> 1
c    (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧  p_782) -> (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0)
c  in CNF:
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_2
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_1
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨  b^{34, 24}_0
c  in DIMACS:
 15533  15534  15535 -782 -15536 0
 15533  15534  15535 -782 -15537 0
 15533  15534  15535 -782  15538 0

c  1+1 --> 2
c    (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0 ∧  p_782) -> (-b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0)
c  in CNF:
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_2
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨  b^{34, 24}_1
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ -p_782 ∨ -b^{34, 24}_0
c  in DIMACS:
 15533  15534 -15535 -782 -15536 0
 15533  15534 -15535 -782  15537 0
 15533  15534 -15535 -782 -15538 0

c  2+1 --> break 
c    (-b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧  p_782) -> break
c  in CNF:
c     b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 15533 -15534  15535 -782 1162 0


c  2-1 --> 1
c    (-b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧ -p_782) -> (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0)
c  in CNF:
c     b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_2
c     b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_1
c     b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨  b^{34, 24}_0
c  in DIMACS:
 15533 -15534  15535  782 -15536 0
 15533 -15534  15535  782 -15537 0
 15533 -15534  15535  782  15538 0

c  1-1 --> 0
c    (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0 ∧ -p_782) -> (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧ -b^{34, 24}_0)
c  in CNF:
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_2
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_1
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_0
c  in DIMACS:
 15533  15534 -15535  782 -15536 0
 15533  15534 -15535  782 -15537 0
 15533  15534 -15535  782 -15538 0

c  0-1 --> -1
c    (-b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧ -p_782) -> ( b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0)
c  in CNF:
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨  b^{34, 24}_2
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_1
c     b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨  b^{34, 24}_0
c  in DIMACS:
 15533  15534  15535  782  15536 0
 15533  15534  15535  782 -15537 0
 15533  15534  15535  782  15538 0

c  -1-1 --> -2
c    ( b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧  b^{34, 23}_0 ∧ -p_782) -> ( b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0)
c  in CNF:
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨  b^{34, 24}_2
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨  b^{34, 24}_1
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨  p_782 ∨ -b^{34, 24}_0
c  in DIMACS:
-15533  15534 -15535  782  15536 0
-15533  15534 -15535  782  15537 0
-15533  15534 -15535  782 -15538 0

c  -2-1 --> break 
c    ( b^{34, 23}_2 ∧  b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨  b^{34, 23}_0 ∨  p_782 ∨ break
c  in DIMACS:
-15533 -15534  15535  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 23}_2 ∧ -b^{34, 23}_1 ∧ -b^{34, 23}_0 ∧ true) 
c  in CNF:
c    -b^{34, 23}_2 ∨  b^{34, 23}_1 ∨  b^{34, 23}_0 ∨ false 
c  in DIMACS:
-15533  15534  15535  0

c  3 does not represent an automaton state.
c    -(-b^{34, 23}_2 ∧  b^{34, 23}_1 ∧  b^{34, 23}_0 ∧ true) 
c  in CNF:
c     b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ false 
c  in DIMACS:
 15533 -15534 -15535  0
c  -3 does not represent an automaton state.
c    -( b^{34, 23}_2 ∧  b^{34, 23}_1 ∧  b^{34, 23}_0 ∧ true) 
c  in CNF:
c    -b^{34, 23}_2 ∨ -b^{34, 23}_1 ∨ -b^{34, 23}_0 ∨ false 
c  in DIMACS:
-15533 -15534 -15535  0

c i = 24
c  -2+1 --> -1
c    ( b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧  p_816) -> ( b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0)
c  in CNF:
c    -b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨  b^{34, 25}_2
c    -b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_1
c    -b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨  b^{34, 25}_0
c  in DIMACS:
-15536 -15537  15538 -816  15539 0
-15536 -15537  15538 -816 -15540 0
-15536 -15537  15538 -816  15541 0

c  -1+1 --> 0
c    ( b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0 ∧  p_816) -> (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧ -b^{34, 25}_0)
c  in CNF:
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_2
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_1
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_0
c  in DIMACS:
-15536  15537 -15538 -816 -15539 0
-15536  15537 -15538 -816 -15540 0
-15536  15537 -15538 -816 -15541 0

c  0+1 --> 1
c    (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧  p_816) -> (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0)
c  in CNF:
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_2
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_1
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨  b^{34, 25}_0
c  in DIMACS:
 15536  15537  15538 -816 -15539 0
 15536  15537  15538 -816 -15540 0
 15536  15537  15538 -816  15541 0

c  1+1 --> 2
c    (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0 ∧  p_816) -> (-b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0)
c  in CNF:
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_2
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨  b^{34, 25}_1
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ -p_816 ∨ -b^{34, 25}_0
c  in DIMACS:
 15536  15537 -15538 -816 -15539 0
 15536  15537 -15538 -816  15540 0
 15536  15537 -15538 -816 -15541 0

c  2+1 --> break 
c    (-b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧  p_816) -> break
c  in CNF:
c     b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 15536 -15537  15538 -816 1162 0


c  2-1 --> 1
c    (-b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧ -p_816) -> (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0)
c  in CNF:
c     b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_2
c     b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_1
c     b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨  b^{34, 25}_0
c  in DIMACS:
 15536 -15537  15538  816 -15539 0
 15536 -15537  15538  816 -15540 0
 15536 -15537  15538  816  15541 0

c  1-1 --> 0
c    (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0 ∧ -p_816) -> (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧ -b^{34, 25}_0)
c  in CNF:
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_2
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_1
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_0
c  in DIMACS:
 15536  15537 -15538  816 -15539 0
 15536  15537 -15538  816 -15540 0
 15536  15537 -15538  816 -15541 0

c  0-1 --> -1
c    (-b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧ -p_816) -> ( b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0)
c  in CNF:
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨  b^{34, 25}_2
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_1
c     b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨  b^{34, 25}_0
c  in DIMACS:
 15536  15537  15538  816  15539 0
 15536  15537  15538  816 -15540 0
 15536  15537  15538  816  15541 0

c  -1-1 --> -2
c    ( b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧  b^{34, 24}_0 ∧ -p_816) -> ( b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0)
c  in CNF:
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨  b^{34, 25}_2
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨  b^{34, 25}_1
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨  p_816 ∨ -b^{34, 25}_0
c  in DIMACS:
-15536  15537 -15538  816  15539 0
-15536  15537 -15538  816  15540 0
-15536  15537 -15538  816 -15541 0

c  -2-1 --> break 
c    ( b^{34, 24}_2 ∧  b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨  b^{34, 24}_0 ∨  p_816 ∨ break
c  in DIMACS:
-15536 -15537  15538  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 24}_2 ∧ -b^{34, 24}_1 ∧ -b^{34, 24}_0 ∧ true) 
c  in CNF:
c    -b^{34, 24}_2 ∨  b^{34, 24}_1 ∨  b^{34, 24}_0 ∨ false 
c  in DIMACS:
-15536  15537  15538  0

c  3 does not represent an automaton state.
c    -(-b^{34, 24}_2 ∧  b^{34, 24}_1 ∧  b^{34, 24}_0 ∧ true) 
c  in CNF:
c     b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ false 
c  in DIMACS:
 15536 -15537 -15538  0
c  -3 does not represent an automaton state.
c    -( b^{34, 24}_2 ∧  b^{34, 24}_1 ∧  b^{34, 24}_0 ∧ true) 
c  in CNF:
c    -b^{34, 24}_2 ∨ -b^{34, 24}_1 ∨ -b^{34, 24}_0 ∨ false 
c  in DIMACS:
-15536 -15537 -15538  0

c i = 25
c  -2+1 --> -1
c    ( b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧  p_850) -> ( b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0)
c  in CNF:
c    -b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨  b^{34, 26}_2
c    -b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_1
c    -b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨  b^{34, 26}_0
c  in DIMACS:
-15539 -15540  15541 -850  15542 0
-15539 -15540  15541 -850 -15543 0
-15539 -15540  15541 -850  15544 0

c  -1+1 --> 0
c    ( b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0 ∧  p_850) -> (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧ -b^{34, 26}_0)
c  in CNF:
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_2
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_1
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_0
c  in DIMACS:
-15539  15540 -15541 -850 -15542 0
-15539  15540 -15541 -850 -15543 0
-15539  15540 -15541 -850 -15544 0

c  0+1 --> 1
c    (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧  p_850) -> (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0)
c  in CNF:
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_2
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_1
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨  b^{34, 26}_0
c  in DIMACS:
 15539  15540  15541 -850 -15542 0
 15539  15540  15541 -850 -15543 0
 15539  15540  15541 -850  15544 0

c  1+1 --> 2
c    (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0 ∧  p_850) -> (-b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0)
c  in CNF:
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_2
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨  b^{34, 26}_1
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ -p_850 ∨ -b^{34, 26}_0
c  in DIMACS:
 15539  15540 -15541 -850 -15542 0
 15539  15540 -15541 -850  15543 0
 15539  15540 -15541 -850 -15544 0

c  2+1 --> break 
c    (-b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧  p_850) -> break
c  in CNF:
c     b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 15539 -15540  15541 -850 1162 0


c  2-1 --> 1
c    (-b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧ -p_850) -> (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0)
c  in CNF:
c     b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_2
c     b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_1
c     b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨  b^{34, 26}_0
c  in DIMACS:
 15539 -15540  15541  850 -15542 0
 15539 -15540  15541  850 -15543 0
 15539 -15540  15541  850  15544 0

c  1-1 --> 0
c    (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0 ∧ -p_850) -> (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧ -b^{34, 26}_0)
c  in CNF:
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_2
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_1
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_0
c  in DIMACS:
 15539  15540 -15541  850 -15542 0
 15539  15540 -15541  850 -15543 0
 15539  15540 -15541  850 -15544 0

c  0-1 --> -1
c    (-b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧ -p_850) -> ( b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0)
c  in CNF:
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨  b^{34, 26}_2
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_1
c     b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨  b^{34, 26}_0
c  in DIMACS:
 15539  15540  15541  850  15542 0
 15539  15540  15541  850 -15543 0
 15539  15540  15541  850  15544 0

c  -1-1 --> -2
c    ( b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧  b^{34, 25}_0 ∧ -p_850) -> ( b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0)
c  in CNF:
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨  b^{34, 26}_2
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨  b^{34, 26}_1
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨  p_850 ∨ -b^{34, 26}_0
c  in DIMACS:
-15539  15540 -15541  850  15542 0
-15539  15540 -15541  850  15543 0
-15539  15540 -15541  850 -15544 0

c  -2-1 --> break 
c    ( b^{34, 25}_2 ∧  b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨  b^{34, 25}_0 ∨  p_850 ∨ break
c  in DIMACS:
-15539 -15540  15541  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 25}_2 ∧ -b^{34, 25}_1 ∧ -b^{34, 25}_0 ∧ true) 
c  in CNF:
c    -b^{34, 25}_2 ∨  b^{34, 25}_1 ∨  b^{34, 25}_0 ∨ false 
c  in DIMACS:
-15539  15540  15541  0

c  3 does not represent an automaton state.
c    -(-b^{34, 25}_2 ∧  b^{34, 25}_1 ∧  b^{34, 25}_0 ∧ true) 
c  in CNF:
c     b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ false 
c  in DIMACS:
 15539 -15540 -15541  0
c  -3 does not represent an automaton state.
c    -( b^{34, 25}_2 ∧  b^{34, 25}_1 ∧  b^{34, 25}_0 ∧ true) 
c  in CNF:
c    -b^{34, 25}_2 ∨ -b^{34, 25}_1 ∨ -b^{34, 25}_0 ∨ false 
c  in DIMACS:
-15539 -15540 -15541  0

c i = 26
c  -2+1 --> -1
c    ( b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧  p_884) -> ( b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0)
c  in CNF:
c    -b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨  b^{34, 27}_2
c    -b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_1
c    -b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨  b^{34, 27}_0
c  in DIMACS:
-15542 -15543  15544 -884  15545 0
-15542 -15543  15544 -884 -15546 0
-15542 -15543  15544 -884  15547 0

c  -1+1 --> 0
c    ( b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0 ∧  p_884) -> (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧ -b^{34, 27}_0)
c  in CNF:
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_2
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_1
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_0
c  in DIMACS:
-15542  15543 -15544 -884 -15545 0
-15542  15543 -15544 -884 -15546 0
-15542  15543 -15544 -884 -15547 0

c  0+1 --> 1
c    (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧  p_884) -> (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0)
c  in CNF:
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_2
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_1
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨  b^{34, 27}_0
c  in DIMACS:
 15542  15543  15544 -884 -15545 0
 15542  15543  15544 -884 -15546 0
 15542  15543  15544 -884  15547 0

c  1+1 --> 2
c    (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0 ∧  p_884) -> (-b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0)
c  in CNF:
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_2
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨  b^{34, 27}_1
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ -p_884 ∨ -b^{34, 27}_0
c  in DIMACS:
 15542  15543 -15544 -884 -15545 0
 15542  15543 -15544 -884  15546 0
 15542  15543 -15544 -884 -15547 0

c  2+1 --> break 
c    (-b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧  p_884) -> break
c  in CNF:
c     b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 15542 -15543  15544 -884 1162 0


c  2-1 --> 1
c    (-b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧ -p_884) -> (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0)
c  in CNF:
c     b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_2
c     b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_1
c     b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨  b^{34, 27}_0
c  in DIMACS:
 15542 -15543  15544  884 -15545 0
 15542 -15543  15544  884 -15546 0
 15542 -15543  15544  884  15547 0

c  1-1 --> 0
c    (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0 ∧ -p_884) -> (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧ -b^{34, 27}_0)
c  in CNF:
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_2
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_1
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_0
c  in DIMACS:
 15542  15543 -15544  884 -15545 0
 15542  15543 -15544  884 -15546 0
 15542  15543 -15544  884 -15547 0

c  0-1 --> -1
c    (-b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧ -p_884) -> ( b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0)
c  in CNF:
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨  b^{34, 27}_2
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_1
c     b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨  b^{34, 27}_0
c  in DIMACS:
 15542  15543  15544  884  15545 0
 15542  15543  15544  884 -15546 0
 15542  15543  15544  884  15547 0

c  -1-1 --> -2
c    ( b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧  b^{34, 26}_0 ∧ -p_884) -> ( b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0)
c  in CNF:
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨  b^{34, 27}_2
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨  b^{34, 27}_1
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨  p_884 ∨ -b^{34, 27}_0
c  in DIMACS:
-15542  15543 -15544  884  15545 0
-15542  15543 -15544  884  15546 0
-15542  15543 -15544  884 -15547 0

c  -2-1 --> break 
c    ( b^{34, 26}_2 ∧  b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨  b^{34, 26}_0 ∨  p_884 ∨ break
c  in DIMACS:
-15542 -15543  15544  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 26}_2 ∧ -b^{34, 26}_1 ∧ -b^{34, 26}_0 ∧ true) 
c  in CNF:
c    -b^{34, 26}_2 ∨  b^{34, 26}_1 ∨  b^{34, 26}_0 ∨ false 
c  in DIMACS:
-15542  15543  15544  0

c  3 does not represent an automaton state.
c    -(-b^{34, 26}_2 ∧  b^{34, 26}_1 ∧  b^{34, 26}_0 ∧ true) 
c  in CNF:
c     b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ false 
c  in DIMACS:
 15542 -15543 -15544  0
c  -3 does not represent an automaton state.
c    -( b^{34, 26}_2 ∧  b^{34, 26}_1 ∧  b^{34, 26}_0 ∧ true) 
c  in CNF:
c    -b^{34, 26}_2 ∨ -b^{34, 26}_1 ∨ -b^{34, 26}_0 ∨ false 
c  in DIMACS:
-15542 -15543 -15544  0

c i = 27
c  -2+1 --> -1
c    ( b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧  p_918) -> ( b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0)
c  in CNF:
c    -b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨  b^{34, 28}_2
c    -b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_1
c    -b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨  b^{34, 28}_0
c  in DIMACS:
-15545 -15546  15547 -918  15548 0
-15545 -15546  15547 -918 -15549 0
-15545 -15546  15547 -918  15550 0

c  -1+1 --> 0
c    ( b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0 ∧  p_918) -> (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧ -b^{34, 28}_0)
c  in CNF:
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_2
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_1
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_0
c  in DIMACS:
-15545  15546 -15547 -918 -15548 0
-15545  15546 -15547 -918 -15549 0
-15545  15546 -15547 -918 -15550 0

c  0+1 --> 1
c    (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧  p_918) -> (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0)
c  in CNF:
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_2
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_1
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨  b^{34, 28}_0
c  in DIMACS:
 15545  15546  15547 -918 -15548 0
 15545  15546  15547 -918 -15549 0
 15545  15546  15547 -918  15550 0

c  1+1 --> 2
c    (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0 ∧  p_918) -> (-b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0)
c  in CNF:
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_2
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨  b^{34, 28}_1
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ -p_918 ∨ -b^{34, 28}_0
c  in DIMACS:
 15545  15546 -15547 -918 -15548 0
 15545  15546 -15547 -918  15549 0
 15545  15546 -15547 -918 -15550 0

c  2+1 --> break 
c    (-b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧  p_918) -> break
c  in CNF:
c     b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 15545 -15546  15547 -918 1162 0


c  2-1 --> 1
c    (-b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧ -p_918) -> (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0)
c  in CNF:
c     b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_2
c     b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_1
c     b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨  b^{34, 28}_0
c  in DIMACS:
 15545 -15546  15547  918 -15548 0
 15545 -15546  15547  918 -15549 0
 15545 -15546  15547  918  15550 0

c  1-1 --> 0
c    (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0 ∧ -p_918) -> (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧ -b^{34, 28}_0)
c  in CNF:
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_2
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_1
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_0
c  in DIMACS:
 15545  15546 -15547  918 -15548 0
 15545  15546 -15547  918 -15549 0
 15545  15546 -15547  918 -15550 0

c  0-1 --> -1
c    (-b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧ -p_918) -> ( b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0)
c  in CNF:
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨  b^{34, 28}_2
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_1
c     b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨  b^{34, 28}_0
c  in DIMACS:
 15545  15546  15547  918  15548 0
 15545  15546  15547  918 -15549 0
 15545  15546  15547  918  15550 0

c  -1-1 --> -2
c    ( b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧  b^{34, 27}_0 ∧ -p_918) -> ( b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0)
c  in CNF:
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨  b^{34, 28}_2
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨  b^{34, 28}_1
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨  p_918 ∨ -b^{34, 28}_0
c  in DIMACS:
-15545  15546 -15547  918  15548 0
-15545  15546 -15547  918  15549 0
-15545  15546 -15547  918 -15550 0

c  -2-1 --> break 
c    ( b^{34, 27}_2 ∧  b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨  b^{34, 27}_0 ∨  p_918 ∨ break
c  in DIMACS:
-15545 -15546  15547  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 27}_2 ∧ -b^{34, 27}_1 ∧ -b^{34, 27}_0 ∧ true) 
c  in CNF:
c    -b^{34, 27}_2 ∨  b^{34, 27}_1 ∨  b^{34, 27}_0 ∨ false 
c  in DIMACS:
-15545  15546  15547  0

c  3 does not represent an automaton state.
c    -(-b^{34, 27}_2 ∧  b^{34, 27}_1 ∧  b^{34, 27}_0 ∧ true) 
c  in CNF:
c     b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ false 
c  in DIMACS:
 15545 -15546 -15547  0
c  -3 does not represent an automaton state.
c    -( b^{34, 27}_2 ∧  b^{34, 27}_1 ∧  b^{34, 27}_0 ∧ true) 
c  in CNF:
c    -b^{34, 27}_2 ∨ -b^{34, 27}_1 ∨ -b^{34, 27}_0 ∨ false 
c  in DIMACS:
-15545 -15546 -15547  0

c i = 28
c  -2+1 --> -1
c    ( b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧  p_952) -> ( b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0)
c  in CNF:
c    -b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨  b^{34, 29}_2
c    -b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_1
c    -b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨  b^{34, 29}_0
c  in DIMACS:
-15548 -15549  15550 -952  15551 0
-15548 -15549  15550 -952 -15552 0
-15548 -15549  15550 -952  15553 0

c  -1+1 --> 0
c    ( b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0 ∧  p_952) -> (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧ -b^{34, 29}_0)
c  in CNF:
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_2
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_1
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_0
c  in DIMACS:
-15548  15549 -15550 -952 -15551 0
-15548  15549 -15550 -952 -15552 0
-15548  15549 -15550 -952 -15553 0

c  0+1 --> 1
c    (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧  p_952) -> (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0)
c  in CNF:
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_2
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_1
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨  b^{34, 29}_0
c  in DIMACS:
 15548  15549  15550 -952 -15551 0
 15548  15549  15550 -952 -15552 0
 15548  15549  15550 -952  15553 0

c  1+1 --> 2
c    (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0 ∧  p_952) -> (-b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0)
c  in CNF:
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_2
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨  b^{34, 29}_1
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ -p_952 ∨ -b^{34, 29}_0
c  in DIMACS:
 15548  15549 -15550 -952 -15551 0
 15548  15549 -15550 -952  15552 0
 15548  15549 -15550 -952 -15553 0

c  2+1 --> break 
c    (-b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧  p_952) -> break
c  in CNF:
c     b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 15548 -15549  15550 -952 1162 0


c  2-1 --> 1
c    (-b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧ -p_952) -> (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0)
c  in CNF:
c     b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_2
c     b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_1
c     b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨  b^{34, 29}_0
c  in DIMACS:
 15548 -15549  15550  952 -15551 0
 15548 -15549  15550  952 -15552 0
 15548 -15549  15550  952  15553 0

c  1-1 --> 0
c    (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0 ∧ -p_952) -> (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧ -b^{34, 29}_0)
c  in CNF:
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_2
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_1
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_0
c  in DIMACS:
 15548  15549 -15550  952 -15551 0
 15548  15549 -15550  952 -15552 0
 15548  15549 -15550  952 -15553 0

c  0-1 --> -1
c    (-b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧ -p_952) -> ( b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0)
c  in CNF:
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨  b^{34, 29}_2
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_1
c     b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨  b^{34, 29}_0
c  in DIMACS:
 15548  15549  15550  952  15551 0
 15548  15549  15550  952 -15552 0
 15548  15549  15550  952  15553 0

c  -1-1 --> -2
c    ( b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧  b^{34, 28}_0 ∧ -p_952) -> ( b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0)
c  in CNF:
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨  b^{34, 29}_2
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨  b^{34, 29}_1
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨  p_952 ∨ -b^{34, 29}_0
c  in DIMACS:
-15548  15549 -15550  952  15551 0
-15548  15549 -15550  952  15552 0
-15548  15549 -15550  952 -15553 0

c  -2-1 --> break 
c    ( b^{34, 28}_2 ∧  b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨  b^{34, 28}_0 ∨  p_952 ∨ break
c  in DIMACS:
-15548 -15549  15550  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 28}_2 ∧ -b^{34, 28}_1 ∧ -b^{34, 28}_0 ∧ true) 
c  in CNF:
c    -b^{34, 28}_2 ∨  b^{34, 28}_1 ∨  b^{34, 28}_0 ∨ false 
c  in DIMACS:
-15548  15549  15550  0

c  3 does not represent an automaton state.
c    -(-b^{34, 28}_2 ∧  b^{34, 28}_1 ∧  b^{34, 28}_0 ∧ true) 
c  in CNF:
c     b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ false 
c  in DIMACS:
 15548 -15549 -15550  0
c  -3 does not represent an automaton state.
c    -( b^{34, 28}_2 ∧  b^{34, 28}_1 ∧  b^{34, 28}_0 ∧ true) 
c  in CNF:
c    -b^{34, 28}_2 ∨ -b^{34, 28}_1 ∨ -b^{34, 28}_0 ∨ false 
c  in DIMACS:
-15548 -15549 -15550  0

c i = 29
c  -2+1 --> -1
c    ( b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧  p_986) -> ( b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0)
c  in CNF:
c    -b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨  b^{34, 30}_2
c    -b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_1
c    -b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨  b^{34, 30}_0
c  in DIMACS:
-15551 -15552  15553 -986  15554 0
-15551 -15552  15553 -986 -15555 0
-15551 -15552  15553 -986  15556 0

c  -1+1 --> 0
c    ( b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0 ∧  p_986) -> (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧ -b^{34, 30}_0)
c  in CNF:
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_2
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_1
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_0
c  in DIMACS:
-15551  15552 -15553 -986 -15554 0
-15551  15552 -15553 -986 -15555 0
-15551  15552 -15553 -986 -15556 0

c  0+1 --> 1
c    (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧  p_986) -> (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0)
c  in CNF:
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_2
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_1
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨  b^{34, 30}_0
c  in DIMACS:
 15551  15552  15553 -986 -15554 0
 15551  15552  15553 -986 -15555 0
 15551  15552  15553 -986  15556 0

c  1+1 --> 2
c    (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0 ∧  p_986) -> (-b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0)
c  in CNF:
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_2
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨  b^{34, 30}_1
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ -p_986 ∨ -b^{34, 30}_0
c  in DIMACS:
 15551  15552 -15553 -986 -15554 0
 15551  15552 -15553 -986  15555 0
 15551  15552 -15553 -986 -15556 0

c  2+1 --> break 
c    (-b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧  p_986) -> break
c  in CNF:
c     b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 15551 -15552  15553 -986 1162 0


c  2-1 --> 1
c    (-b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧ -p_986) -> (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0)
c  in CNF:
c     b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_2
c     b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_1
c     b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨  b^{34, 30}_0
c  in DIMACS:
 15551 -15552  15553  986 -15554 0
 15551 -15552  15553  986 -15555 0
 15551 -15552  15553  986  15556 0

c  1-1 --> 0
c    (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0 ∧ -p_986) -> (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧ -b^{34, 30}_0)
c  in CNF:
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_2
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_1
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_0
c  in DIMACS:
 15551  15552 -15553  986 -15554 0
 15551  15552 -15553  986 -15555 0
 15551  15552 -15553  986 -15556 0

c  0-1 --> -1
c    (-b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧ -p_986) -> ( b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0)
c  in CNF:
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨  b^{34, 30}_2
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_1
c     b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨  b^{34, 30}_0
c  in DIMACS:
 15551  15552  15553  986  15554 0
 15551  15552  15553  986 -15555 0
 15551  15552  15553  986  15556 0

c  -1-1 --> -2
c    ( b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧  b^{34, 29}_0 ∧ -p_986) -> ( b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0)
c  in CNF:
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨  b^{34, 30}_2
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨  b^{34, 30}_1
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨  p_986 ∨ -b^{34, 30}_0
c  in DIMACS:
-15551  15552 -15553  986  15554 0
-15551  15552 -15553  986  15555 0
-15551  15552 -15553  986 -15556 0

c  -2-1 --> break 
c    ( b^{34, 29}_2 ∧  b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨  b^{34, 29}_0 ∨  p_986 ∨ break
c  in DIMACS:
-15551 -15552  15553  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 29}_2 ∧ -b^{34, 29}_1 ∧ -b^{34, 29}_0 ∧ true) 
c  in CNF:
c    -b^{34, 29}_2 ∨  b^{34, 29}_1 ∨  b^{34, 29}_0 ∨ false 
c  in DIMACS:
-15551  15552  15553  0

c  3 does not represent an automaton state.
c    -(-b^{34, 29}_2 ∧  b^{34, 29}_1 ∧  b^{34, 29}_0 ∧ true) 
c  in CNF:
c     b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ false 
c  in DIMACS:
 15551 -15552 -15553  0
c  -3 does not represent an automaton state.
c    -( b^{34, 29}_2 ∧  b^{34, 29}_1 ∧  b^{34, 29}_0 ∧ true) 
c  in CNF:
c    -b^{34, 29}_2 ∨ -b^{34, 29}_1 ∨ -b^{34, 29}_0 ∨ false 
c  in DIMACS:
-15551 -15552 -15553  0

c i = 30
c  -2+1 --> -1
c    ( b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧  p_1020) -> ( b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0)
c  in CNF:
c    -b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨  b^{34, 31}_2
c    -b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_1
c    -b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨  b^{34, 31}_0
c  in DIMACS:
-15554 -15555  15556 -1020  15557 0
-15554 -15555  15556 -1020 -15558 0
-15554 -15555  15556 -1020  15559 0

c  -1+1 --> 0
c    ( b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0 ∧  p_1020) -> (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧ -b^{34, 31}_0)
c  in CNF:
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_2
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_1
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_0
c  in DIMACS:
-15554  15555 -15556 -1020 -15557 0
-15554  15555 -15556 -1020 -15558 0
-15554  15555 -15556 -1020 -15559 0

c  0+1 --> 1
c    (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧  p_1020) -> (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0)
c  in CNF:
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_2
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_1
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨  b^{34, 31}_0
c  in DIMACS:
 15554  15555  15556 -1020 -15557 0
 15554  15555  15556 -1020 -15558 0
 15554  15555  15556 -1020  15559 0

c  1+1 --> 2
c    (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0 ∧  p_1020) -> (-b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0)
c  in CNF:
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_2
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨  b^{34, 31}_1
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ -p_1020 ∨ -b^{34, 31}_0
c  in DIMACS:
 15554  15555 -15556 -1020 -15557 0
 15554  15555 -15556 -1020  15558 0
 15554  15555 -15556 -1020 -15559 0

c  2+1 --> break 
c    (-b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 15554 -15555  15556 -1020 1162 0


c  2-1 --> 1
c    (-b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧ -p_1020) -> (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0)
c  in CNF:
c     b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_2
c     b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_1
c     b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨  b^{34, 31}_0
c  in DIMACS:
 15554 -15555  15556  1020 -15557 0
 15554 -15555  15556  1020 -15558 0
 15554 -15555  15556  1020  15559 0

c  1-1 --> 0
c    (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0 ∧ -p_1020) -> (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧ -b^{34, 31}_0)
c  in CNF:
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_2
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_1
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_0
c  in DIMACS:
 15554  15555 -15556  1020 -15557 0
 15554  15555 -15556  1020 -15558 0
 15554  15555 -15556  1020 -15559 0

c  0-1 --> -1
c    (-b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧ -p_1020) -> ( b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0)
c  in CNF:
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨  b^{34, 31}_2
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_1
c     b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨  b^{34, 31}_0
c  in DIMACS:
 15554  15555  15556  1020  15557 0
 15554  15555  15556  1020 -15558 0
 15554  15555  15556  1020  15559 0

c  -1-1 --> -2
c    ( b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧  b^{34, 30}_0 ∧ -p_1020) -> ( b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0)
c  in CNF:
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨  b^{34, 31}_2
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨  b^{34, 31}_1
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨  p_1020 ∨ -b^{34, 31}_0
c  in DIMACS:
-15554  15555 -15556  1020  15557 0
-15554  15555 -15556  1020  15558 0
-15554  15555 -15556  1020 -15559 0

c  -2-1 --> break 
c    ( b^{34, 30}_2 ∧  b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨  b^{34, 30}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-15554 -15555  15556  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 30}_2 ∧ -b^{34, 30}_1 ∧ -b^{34, 30}_0 ∧ true) 
c  in CNF:
c    -b^{34, 30}_2 ∨  b^{34, 30}_1 ∨  b^{34, 30}_0 ∨ false 
c  in DIMACS:
-15554  15555  15556  0

c  3 does not represent an automaton state.
c    -(-b^{34, 30}_2 ∧  b^{34, 30}_1 ∧  b^{34, 30}_0 ∧ true) 
c  in CNF:
c     b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ false 
c  in DIMACS:
 15554 -15555 -15556  0
c  -3 does not represent an automaton state.
c    -( b^{34, 30}_2 ∧  b^{34, 30}_1 ∧  b^{34, 30}_0 ∧ true) 
c  in CNF:
c    -b^{34, 30}_2 ∨ -b^{34, 30}_1 ∨ -b^{34, 30}_0 ∨ false 
c  in DIMACS:
-15554 -15555 -15556  0

c i = 31
c  -2+1 --> -1
c    ( b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧  p_1054) -> ( b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0)
c  in CNF:
c    -b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨  b^{34, 32}_2
c    -b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_1
c    -b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨  b^{34, 32}_0
c  in DIMACS:
-15557 -15558  15559 -1054  15560 0
-15557 -15558  15559 -1054 -15561 0
-15557 -15558  15559 -1054  15562 0

c  -1+1 --> 0
c    ( b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0 ∧  p_1054) -> (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧ -b^{34, 32}_0)
c  in CNF:
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_2
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_1
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_0
c  in DIMACS:
-15557  15558 -15559 -1054 -15560 0
-15557  15558 -15559 -1054 -15561 0
-15557  15558 -15559 -1054 -15562 0

c  0+1 --> 1
c    (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧  p_1054) -> (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0)
c  in CNF:
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_2
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_1
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨  b^{34, 32}_0
c  in DIMACS:
 15557  15558  15559 -1054 -15560 0
 15557  15558  15559 -1054 -15561 0
 15557  15558  15559 -1054  15562 0

c  1+1 --> 2
c    (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0 ∧  p_1054) -> (-b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0)
c  in CNF:
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_2
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨  b^{34, 32}_1
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ -p_1054 ∨ -b^{34, 32}_0
c  in DIMACS:
 15557  15558 -15559 -1054 -15560 0
 15557  15558 -15559 -1054  15561 0
 15557  15558 -15559 -1054 -15562 0

c  2+1 --> break 
c    (-b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 15557 -15558  15559 -1054 1162 0


c  2-1 --> 1
c    (-b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧ -p_1054) -> (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0)
c  in CNF:
c     b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_2
c     b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_1
c     b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨  b^{34, 32}_0
c  in DIMACS:
 15557 -15558  15559  1054 -15560 0
 15557 -15558  15559  1054 -15561 0
 15557 -15558  15559  1054  15562 0

c  1-1 --> 0
c    (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0 ∧ -p_1054) -> (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧ -b^{34, 32}_0)
c  in CNF:
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_2
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_1
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_0
c  in DIMACS:
 15557  15558 -15559  1054 -15560 0
 15557  15558 -15559  1054 -15561 0
 15557  15558 -15559  1054 -15562 0

c  0-1 --> -1
c    (-b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧ -p_1054) -> ( b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0)
c  in CNF:
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨  b^{34, 32}_2
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_1
c     b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨  b^{34, 32}_0
c  in DIMACS:
 15557  15558  15559  1054  15560 0
 15557  15558  15559  1054 -15561 0
 15557  15558  15559  1054  15562 0

c  -1-1 --> -2
c    ( b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧  b^{34, 31}_0 ∧ -p_1054) -> ( b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0)
c  in CNF:
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨  b^{34, 32}_2
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨  b^{34, 32}_1
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨  p_1054 ∨ -b^{34, 32}_0
c  in DIMACS:
-15557  15558 -15559  1054  15560 0
-15557  15558 -15559  1054  15561 0
-15557  15558 -15559  1054 -15562 0

c  -2-1 --> break 
c    ( b^{34, 31}_2 ∧  b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨  b^{34, 31}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-15557 -15558  15559  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 31}_2 ∧ -b^{34, 31}_1 ∧ -b^{34, 31}_0 ∧ true) 
c  in CNF:
c    -b^{34, 31}_2 ∨  b^{34, 31}_1 ∨  b^{34, 31}_0 ∨ false 
c  in DIMACS:
-15557  15558  15559  0

c  3 does not represent an automaton state.
c    -(-b^{34, 31}_2 ∧  b^{34, 31}_1 ∧  b^{34, 31}_0 ∧ true) 
c  in CNF:
c     b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ false 
c  in DIMACS:
 15557 -15558 -15559  0
c  -3 does not represent an automaton state.
c    -( b^{34, 31}_2 ∧  b^{34, 31}_1 ∧  b^{34, 31}_0 ∧ true) 
c  in CNF:
c    -b^{34, 31}_2 ∨ -b^{34, 31}_1 ∨ -b^{34, 31}_0 ∨ false 
c  in DIMACS:
-15557 -15558 -15559  0

c i = 32
c  -2+1 --> -1
c    ( b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧  p_1088) -> ( b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0)
c  in CNF:
c    -b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨  b^{34, 33}_2
c    -b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_1
c    -b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨  b^{34, 33}_0
c  in DIMACS:
-15560 -15561  15562 -1088  15563 0
-15560 -15561  15562 -1088 -15564 0
-15560 -15561  15562 -1088  15565 0

c  -1+1 --> 0
c    ( b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0 ∧  p_1088) -> (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧ -b^{34, 33}_0)
c  in CNF:
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_2
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_1
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_0
c  in DIMACS:
-15560  15561 -15562 -1088 -15563 0
-15560  15561 -15562 -1088 -15564 0
-15560  15561 -15562 -1088 -15565 0

c  0+1 --> 1
c    (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧  p_1088) -> (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0)
c  in CNF:
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_2
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_1
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨  b^{34, 33}_0
c  in DIMACS:
 15560  15561  15562 -1088 -15563 0
 15560  15561  15562 -1088 -15564 0
 15560  15561  15562 -1088  15565 0

c  1+1 --> 2
c    (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0 ∧  p_1088) -> (-b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0)
c  in CNF:
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_2
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨  b^{34, 33}_1
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ -p_1088 ∨ -b^{34, 33}_0
c  in DIMACS:
 15560  15561 -15562 -1088 -15563 0
 15560  15561 -15562 -1088  15564 0
 15560  15561 -15562 -1088 -15565 0

c  2+1 --> break 
c    (-b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 15560 -15561  15562 -1088 1162 0


c  2-1 --> 1
c    (-b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧ -p_1088) -> (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0)
c  in CNF:
c     b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_2
c     b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_1
c     b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨  b^{34, 33}_0
c  in DIMACS:
 15560 -15561  15562  1088 -15563 0
 15560 -15561  15562  1088 -15564 0
 15560 -15561  15562  1088  15565 0

c  1-1 --> 0
c    (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0 ∧ -p_1088) -> (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧ -b^{34, 33}_0)
c  in CNF:
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_2
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_1
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_0
c  in DIMACS:
 15560  15561 -15562  1088 -15563 0
 15560  15561 -15562  1088 -15564 0
 15560  15561 -15562  1088 -15565 0

c  0-1 --> -1
c    (-b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧ -p_1088) -> ( b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0)
c  in CNF:
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨  b^{34, 33}_2
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_1
c     b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨  b^{34, 33}_0
c  in DIMACS:
 15560  15561  15562  1088  15563 0
 15560  15561  15562  1088 -15564 0
 15560  15561  15562  1088  15565 0

c  -1-1 --> -2
c    ( b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧  b^{34, 32}_0 ∧ -p_1088) -> ( b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0)
c  in CNF:
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨  b^{34, 33}_2
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨  b^{34, 33}_1
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨  p_1088 ∨ -b^{34, 33}_0
c  in DIMACS:
-15560  15561 -15562  1088  15563 0
-15560  15561 -15562  1088  15564 0
-15560  15561 -15562  1088 -15565 0

c  -2-1 --> break 
c    ( b^{34, 32}_2 ∧  b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨  b^{34, 32}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-15560 -15561  15562  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 32}_2 ∧ -b^{34, 32}_1 ∧ -b^{34, 32}_0 ∧ true) 
c  in CNF:
c    -b^{34, 32}_2 ∨  b^{34, 32}_1 ∨  b^{34, 32}_0 ∨ false 
c  in DIMACS:
-15560  15561  15562  0

c  3 does not represent an automaton state.
c    -(-b^{34, 32}_2 ∧  b^{34, 32}_1 ∧  b^{34, 32}_0 ∧ true) 
c  in CNF:
c     b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ false 
c  in DIMACS:
 15560 -15561 -15562  0
c  -3 does not represent an automaton state.
c    -( b^{34, 32}_2 ∧  b^{34, 32}_1 ∧  b^{34, 32}_0 ∧ true) 
c  in CNF:
c    -b^{34, 32}_2 ∨ -b^{34, 32}_1 ∨ -b^{34, 32}_0 ∨ false 
c  in DIMACS:
-15560 -15561 -15562  0

c i = 33
c  -2+1 --> -1
c    ( b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧  p_1122) -> ( b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0)
c  in CNF:
c    -b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨  b^{34, 34}_2
c    -b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_1
c    -b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨  b^{34, 34}_0
c  in DIMACS:
-15563 -15564  15565 -1122  15566 0
-15563 -15564  15565 -1122 -15567 0
-15563 -15564  15565 -1122  15568 0

c  -1+1 --> 0
c    ( b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0 ∧  p_1122) -> (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧ -b^{34, 34}_0)
c  in CNF:
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_2
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_1
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_0
c  in DIMACS:
-15563  15564 -15565 -1122 -15566 0
-15563  15564 -15565 -1122 -15567 0
-15563  15564 -15565 -1122 -15568 0

c  0+1 --> 1
c    (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧  p_1122) -> (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0)
c  in CNF:
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_2
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_1
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨  b^{34, 34}_0
c  in DIMACS:
 15563  15564  15565 -1122 -15566 0
 15563  15564  15565 -1122 -15567 0
 15563  15564  15565 -1122  15568 0

c  1+1 --> 2
c    (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0 ∧  p_1122) -> (-b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0)
c  in CNF:
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_2
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨  b^{34, 34}_1
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ -p_1122 ∨ -b^{34, 34}_0
c  in DIMACS:
 15563  15564 -15565 -1122 -15566 0
 15563  15564 -15565 -1122  15567 0
 15563  15564 -15565 -1122 -15568 0

c  2+1 --> break 
c    (-b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 15563 -15564  15565 -1122 1162 0


c  2-1 --> 1
c    (-b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧ -p_1122) -> (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0)
c  in CNF:
c     b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_2
c     b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_1
c     b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨  b^{34, 34}_0
c  in DIMACS:
 15563 -15564  15565  1122 -15566 0
 15563 -15564  15565  1122 -15567 0
 15563 -15564  15565  1122  15568 0

c  1-1 --> 0
c    (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0 ∧ -p_1122) -> (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧ -b^{34, 34}_0)
c  in CNF:
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_2
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_1
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_0
c  in DIMACS:
 15563  15564 -15565  1122 -15566 0
 15563  15564 -15565  1122 -15567 0
 15563  15564 -15565  1122 -15568 0

c  0-1 --> -1
c    (-b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧ -p_1122) -> ( b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0)
c  in CNF:
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨  b^{34, 34}_2
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_1
c     b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨  b^{34, 34}_0
c  in DIMACS:
 15563  15564  15565  1122  15566 0
 15563  15564  15565  1122 -15567 0
 15563  15564  15565  1122  15568 0

c  -1-1 --> -2
c    ( b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧  b^{34, 33}_0 ∧ -p_1122) -> ( b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0)
c  in CNF:
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨  b^{34, 34}_2
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨  b^{34, 34}_1
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨  p_1122 ∨ -b^{34, 34}_0
c  in DIMACS:
-15563  15564 -15565  1122  15566 0
-15563  15564 -15565  1122  15567 0
-15563  15564 -15565  1122 -15568 0

c  -2-1 --> break 
c    ( b^{34, 33}_2 ∧  b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨  b^{34, 33}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-15563 -15564  15565  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 33}_2 ∧ -b^{34, 33}_1 ∧ -b^{34, 33}_0 ∧ true) 
c  in CNF:
c    -b^{34, 33}_2 ∨  b^{34, 33}_1 ∨  b^{34, 33}_0 ∨ false 
c  in DIMACS:
-15563  15564  15565  0

c  3 does not represent an automaton state.
c    -(-b^{34, 33}_2 ∧  b^{34, 33}_1 ∧  b^{34, 33}_0 ∧ true) 
c  in CNF:
c     b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ false 
c  in DIMACS:
 15563 -15564 -15565  0
c  -3 does not represent an automaton state.
c    -( b^{34, 33}_2 ∧  b^{34, 33}_1 ∧  b^{34, 33}_0 ∧ true) 
c  in CNF:
c    -b^{34, 33}_2 ∨ -b^{34, 33}_1 ∨ -b^{34, 33}_0 ∨ false 
c  in DIMACS:
-15563 -15564 -15565  0

c i = 34
c  -2+1 --> -1
c    ( b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧  p_1156) -> ( b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧  b^{34, 35}_0)
c  in CNF:
c    -b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨  b^{34, 35}_2
c    -b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_1
c    -b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨  b^{34, 35}_0
c  in DIMACS:
-15566 -15567  15568 -1156  15569 0
-15566 -15567  15568 -1156 -15570 0
-15566 -15567  15568 -1156  15571 0

c  -1+1 --> 0
c    ( b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0 ∧  p_1156) -> (-b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧ -b^{34, 35}_0)
c  in CNF:
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_2
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_1
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_0
c  in DIMACS:
-15566  15567 -15568 -1156 -15569 0
-15566  15567 -15568 -1156 -15570 0
-15566  15567 -15568 -1156 -15571 0

c  0+1 --> 1
c    (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧  p_1156) -> (-b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧  b^{34, 35}_0)
c  in CNF:
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_2
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_1
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨  b^{34, 35}_0
c  in DIMACS:
 15566  15567  15568 -1156 -15569 0
 15566  15567  15568 -1156 -15570 0
 15566  15567  15568 -1156  15571 0

c  1+1 --> 2
c    (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0 ∧  p_1156) -> (-b^{34, 35}_2 ∧  b^{34, 35}_1 ∧ -b^{34, 35}_0)
c  in CNF:
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_2
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨  b^{34, 35}_1
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ -p_1156 ∨ -b^{34, 35}_0
c  in DIMACS:
 15566  15567 -15568 -1156 -15569 0
 15566  15567 -15568 -1156  15570 0
 15566  15567 -15568 -1156 -15571 0

c  2+1 --> break 
c    (-b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 15566 -15567  15568 -1156 1162 0


c  2-1 --> 1
c    (-b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧ -p_1156) -> (-b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧  b^{34, 35}_0)
c  in CNF:
c     b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_2
c     b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_1
c     b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨  b^{34, 35}_0
c  in DIMACS:
 15566 -15567  15568  1156 -15569 0
 15566 -15567  15568  1156 -15570 0
 15566 -15567  15568  1156  15571 0

c  1-1 --> 0
c    (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0 ∧ -p_1156) -> (-b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧ -b^{34, 35}_0)
c  in CNF:
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_2
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_1
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_0
c  in DIMACS:
 15566  15567 -15568  1156 -15569 0
 15566  15567 -15568  1156 -15570 0
 15566  15567 -15568  1156 -15571 0

c  0-1 --> -1
c    (-b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧ -p_1156) -> ( b^{34, 35}_2 ∧ -b^{34, 35}_1 ∧  b^{34, 35}_0)
c  in CNF:
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨  b^{34, 35}_2
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_1
c     b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨  b^{34, 35}_0
c  in DIMACS:
 15566  15567  15568  1156  15569 0
 15566  15567  15568  1156 -15570 0
 15566  15567  15568  1156  15571 0

c  -1-1 --> -2
c    ( b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧  b^{34, 34}_0 ∧ -p_1156) -> ( b^{34, 35}_2 ∧  b^{34, 35}_1 ∧ -b^{34, 35}_0)
c  in CNF:
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨  b^{34, 35}_2
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨  b^{34, 35}_1
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨  p_1156 ∨ -b^{34, 35}_0
c  in DIMACS:
-15566  15567 -15568  1156  15569 0
-15566  15567 -15568  1156  15570 0
-15566  15567 -15568  1156 -15571 0

c  -2-1 --> break 
c    ( b^{34, 34}_2 ∧  b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨  b^{34, 34}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-15566 -15567  15568  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{34, 34}_2 ∧ -b^{34, 34}_1 ∧ -b^{34, 34}_0 ∧ true) 
c  in CNF:
c    -b^{34, 34}_2 ∨  b^{34, 34}_1 ∨  b^{34, 34}_0 ∨ false 
c  in DIMACS:
-15566  15567  15568  0

c  3 does not represent an automaton state.
c    -(-b^{34, 34}_2 ∧  b^{34, 34}_1 ∧  b^{34, 34}_0 ∧ true) 
c  in CNF:
c     b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ false 
c  in DIMACS:
 15566 -15567 -15568  0
c  -3 does not represent an automaton state.
c    -( b^{34, 34}_2 ∧  b^{34, 34}_1 ∧  b^{34, 34}_0 ∧ true) 
c  in CNF:
c    -b^{34, 34}_2 ∨ -b^{34, 34}_1 ∨ -b^{34, 34}_0 ∨ false 
c  in DIMACS:
-15566 -15567 -15568  0

c INIT for k = 35
c    -b^{35, 1}_2
c    -b^{35, 1}_1
c    -b^{35, 1}_0
c  in DIMACS:
-15572 0
-15573 0
-15574 0

c Transitions for k = 35
c i = 1
c  -2+1 --> -1
c    ( b^{35, 1}_2 ∧  b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧  p_35) -> ( b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0)
c  in CNF:
c    -b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨  b^{35, 2}_2
c    -b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_1
c    -b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨  b^{35, 2}_0
c  in DIMACS:
-15572 -15573  15574 -35  15575 0
-15572 -15573  15574 -35 -15576 0
-15572 -15573  15574 -35  15577 0

c  -1+1 --> 0
c    ( b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧  b^{35, 1}_0 ∧  p_35) -> (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧ -b^{35, 2}_0)
c  in CNF:
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_2
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_1
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_0
c  in DIMACS:
-15572  15573 -15574 -35 -15575 0
-15572  15573 -15574 -35 -15576 0
-15572  15573 -15574 -35 -15577 0

c  0+1 --> 1
c    (-b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧  p_35) -> (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0)
c  in CNF:
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_2
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_1
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨  b^{35, 2}_0
c  in DIMACS:
 15572  15573  15574 -35 -15575 0
 15572  15573  15574 -35 -15576 0
 15572  15573  15574 -35  15577 0

c  1+1 --> 2
c    (-b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧  b^{35, 1}_0 ∧  p_35) -> (-b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0)
c  in CNF:
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_2
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨  b^{35, 2}_1
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ -p_35 ∨ -b^{35, 2}_0
c  in DIMACS:
 15572  15573 -15574 -35 -15575 0
 15572  15573 -15574 -35  15576 0
 15572  15573 -15574 -35 -15577 0

c  2+1 --> break 
c    (-b^{35, 1}_2 ∧  b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧  p_35) -> break
c  in CNF:
c     b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ -p_35 ∨ break
c  in DIMACS:
 15572 -15573  15574 -35 1162 0


c  2-1 --> 1
c    (-b^{35, 1}_2 ∧  b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧ -p_35) -> (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0)
c  in CNF:
c     b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_2
c     b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_1
c     b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨  b^{35, 2}_0
c  in DIMACS:
 15572 -15573  15574  35 -15575 0
 15572 -15573  15574  35 -15576 0
 15572 -15573  15574  35  15577 0

c  1-1 --> 0
c    (-b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧  b^{35, 1}_0 ∧ -p_35) -> (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧ -b^{35, 2}_0)
c  in CNF:
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_2
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_1
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_0
c  in DIMACS:
 15572  15573 -15574  35 -15575 0
 15572  15573 -15574  35 -15576 0
 15572  15573 -15574  35 -15577 0

c  0-1 --> -1
c    (-b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧ -p_35) -> ( b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0)
c  in CNF:
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨  b^{35, 2}_2
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_1
c     b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨  b^{35, 2}_0
c  in DIMACS:
 15572  15573  15574  35  15575 0
 15572  15573  15574  35 -15576 0
 15572  15573  15574  35  15577 0

c  -1-1 --> -2
c    ( b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧  b^{35, 1}_0 ∧ -p_35) -> ( b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0)
c  in CNF:
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨  b^{35, 2}_2
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨  b^{35, 2}_1
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨  p_35 ∨ -b^{35, 2}_0
c  in DIMACS:
-15572  15573 -15574  35  15575 0
-15572  15573 -15574  35  15576 0
-15572  15573 -15574  35 -15577 0

c  -2-1 --> break 
c    ( b^{35, 1}_2 ∧  b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧ -p_35) -> break
c  in CNF:
c    -b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨  b^{35, 1}_0 ∨  p_35 ∨ break
c  in DIMACS:
-15572 -15573  15574  35 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 1}_2 ∧ -b^{35, 1}_1 ∧ -b^{35, 1}_0 ∧ true) 
c  in CNF:
c    -b^{35, 1}_2 ∨  b^{35, 1}_1 ∨  b^{35, 1}_0 ∨ false 
c  in DIMACS:
-15572  15573  15574  0

c  3 does not represent an automaton state.
c    -(-b^{35, 1}_2 ∧  b^{35, 1}_1 ∧  b^{35, 1}_0 ∧ true) 
c  in CNF:
c     b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ false 
c  in DIMACS:
 15572 -15573 -15574  0
c  -3 does not represent an automaton state.
c    -( b^{35, 1}_2 ∧  b^{35, 1}_1 ∧  b^{35, 1}_0 ∧ true) 
c  in CNF:
c    -b^{35, 1}_2 ∨ -b^{35, 1}_1 ∨ -b^{35, 1}_0 ∨ false 
c  in DIMACS:
-15572 -15573 -15574  0

c i = 2
c  -2+1 --> -1
c    ( b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧  p_70) -> ( b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0)
c  in CNF:
c    -b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨  b^{35, 3}_2
c    -b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_1
c    -b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨  b^{35, 3}_0
c  in DIMACS:
-15575 -15576  15577 -70  15578 0
-15575 -15576  15577 -70 -15579 0
-15575 -15576  15577 -70  15580 0

c  -1+1 --> 0
c    ( b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0 ∧  p_70) -> (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧ -b^{35, 3}_0)
c  in CNF:
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_2
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_1
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_0
c  in DIMACS:
-15575  15576 -15577 -70 -15578 0
-15575  15576 -15577 -70 -15579 0
-15575  15576 -15577 -70 -15580 0

c  0+1 --> 1
c    (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧  p_70) -> (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0)
c  in CNF:
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_2
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_1
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨  b^{35, 3}_0
c  in DIMACS:
 15575  15576  15577 -70 -15578 0
 15575  15576  15577 -70 -15579 0
 15575  15576  15577 -70  15580 0

c  1+1 --> 2
c    (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0 ∧  p_70) -> (-b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0)
c  in CNF:
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_2
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨  b^{35, 3}_1
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ -p_70 ∨ -b^{35, 3}_0
c  in DIMACS:
 15575  15576 -15577 -70 -15578 0
 15575  15576 -15577 -70  15579 0
 15575  15576 -15577 -70 -15580 0

c  2+1 --> break 
c    (-b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧  p_70) -> break
c  in CNF:
c     b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 15575 -15576  15577 -70 1162 0


c  2-1 --> 1
c    (-b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧ -p_70) -> (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0)
c  in CNF:
c     b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_2
c     b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_1
c     b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨  b^{35, 3}_0
c  in DIMACS:
 15575 -15576  15577  70 -15578 0
 15575 -15576  15577  70 -15579 0
 15575 -15576  15577  70  15580 0

c  1-1 --> 0
c    (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0 ∧ -p_70) -> (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧ -b^{35, 3}_0)
c  in CNF:
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_2
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_1
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_0
c  in DIMACS:
 15575  15576 -15577  70 -15578 0
 15575  15576 -15577  70 -15579 0
 15575  15576 -15577  70 -15580 0

c  0-1 --> -1
c    (-b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧ -p_70) -> ( b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0)
c  in CNF:
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨  b^{35, 3}_2
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_1
c     b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨  b^{35, 3}_0
c  in DIMACS:
 15575  15576  15577  70  15578 0
 15575  15576  15577  70 -15579 0
 15575  15576  15577  70  15580 0

c  -1-1 --> -2
c    ( b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧  b^{35, 2}_0 ∧ -p_70) -> ( b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0)
c  in CNF:
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨  b^{35, 3}_2
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨  b^{35, 3}_1
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨  p_70 ∨ -b^{35, 3}_0
c  in DIMACS:
-15575  15576 -15577  70  15578 0
-15575  15576 -15577  70  15579 0
-15575  15576 -15577  70 -15580 0

c  -2-1 --> break 
c    ( b^{35, 2}_2 ∧  b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨  b^{35, 2}_0 ∨  p_70 ∨ break
c  in DIMACS:
-15575 -15576  15577  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 2}_2 ∧ -b^{35, 2}_1 ∧ -b^{35, 2}_0 ∧ true) 
c  in CNF:
c    -b^{35, 2}_2 ∨  b^{35, 2}_1 ∨  b^{35, 2}_0 ∨ false 
c  in DIMACS:
-15575  15576  15577  0

c  3 does not represent an automaton state.
c    -(-b^{35, 2}_2 ∧  b^{35, 2}_1 ∧  b^{35, 2}_0 ∧ true) 
c  in CNF:
c     b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ false 
c  in DIMACS:
 15575 -15576 -15577  0
c  -3 does not represent an automaton state.
c    -( b^{35, 2}_2 ∧  b^{35, 2}_1 ∧  b^{35, 2}_0 ∧ true) 
c  in CNF:
c    -b^{35, 2}_2 ∨ -b^{35, 2}_1 ∨ -b^{35, 2}_0 ∨ false 
c  in DIMACS:
-15575 -15576 -15577  0

c i = 3
c  -2+1 --> -1
c    ( b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧  p_105) -> ( b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0)
c  in CNF:
c    -b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨  b^{35, 4}_2
c    -b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_1
c    -b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨  b^{35, 4}_0
c  in DIMACS:
-15578 -15579  15580 -105  15581 0
-15578 -15579  15580 -105 -15582 0
-15578 -15579  15580 -105  15583 0

c  -1+1 --> 0
c    ( b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0 ∧  p_105) -> (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧ -b^{35, 4}_0)
c  in CNF:
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_2
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_1
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_0
c  in DIMACS:
-15578  15579 -15580 -105 -15581 0
-15578  15579 -15580 -105 -15582 0
-15578  15579 -15580 -105 -15583 0

c  0+1 --> 1
c    (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧  p_105) -> (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0)
c  in CNF:
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_2
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_1
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨  b^{35, 4}_0
c  in DIMACS:
 15578  15579  15580 -105 -15581 0
 15578  15579  15580 -105 -15582 0
 15578  15579  15580 -105  15583 0

c  1+1 --> 2
c    (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0 ∧  p_105) -> (-b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0)
c  in CNF:
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_2
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨  b^{35, 4}_1
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ -p_105 ∨ -b^{35, 4}_0
c  in DIMACS:
 15578  15579 -15580 -105 -15581 0
 15578  15579 -15580 -105  15582 0
 15578  15579 -15580 -105 -15583 0

c  2+1 --> break 
c    (-b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧  p_105) -> break
c  in CNF:
c     b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 15578 -15579  15580 -105 1162 0


c  2-1 --> 1
c    (-b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧ -p_105) -> (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0)
c  in CNF:
c     b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_2
c     b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_1
c     b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨  b^{35, 4}_0
c  in DIMACS:
 15578 -15579  15580  105 -15581 0
 15578 -15579  15580  105 -15582 0
 15578 -15579  15580  105  15583 0

c  1-1 --> 0
c    (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0 ∧ -p_105) -> (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧ -b^{35, 4}_0)
c  in CNF:
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_2
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_1
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_0
c  in DIMACS:
 15578  15579 -15580  105 -15581 0
 15578  15579 -15580  105 -15582 0
 15578  15579 -15580  105 -15583 0

c  0-1 --> -1
c    (-b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧ -p_105) -> ( b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0)
c  in CNF:
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨  b^{35, 4}_2
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_1
c     b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨  b^{35, 4}_0
c  in DIMACS:
 15578  15579  15580  105  15581 0
 15578  15579  15580  105 -15582 0
 15578  15579  15580  105  15583 0

c  -1-1 --> -2
c    ( b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧  b^{35, 3}_0 ∧ -p_105) -> ( b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0)
c  in CNF:
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨  b^{35, 4}_2
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨  b^{35, 4}_1
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨  p_105 ∨ -b^{35, 4}_0
c  in DIMACS:
-15578  15579 -15580  105  15581 0
-15578  15579 -15580  105  15582 0
-15578  15579 -15580  105 -15583 0

c  -2-1 --> break 
c    ( b^{35, 3}_2 ∧  b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨  b^{35, 3}_0 ∨  p_105 ∨ break
c  in DIMACS:
-15578 -15579  15580  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 3}_2 ∧ -b^{35, 3}_1 ∧ -b^{35, 3}_0 ∧ true) 
c  in CNF:
c    -b^{35, 3}_2 ∨  b^{35, 3}_1 ∨  b^{35, 3}_0 ∨ false 
c  in DIMACS:
-15578  15579  15580  0

c  3 does not represent an automaton state.
c    -(-b^{35, 3}_2 ∧  b^{35, 3}_1 ∧  b^{35, 3}_0 ∧ true) 
c  in CNF:
c     b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ false 
c  in DIMACS:
 15578 -15579 -15580  0
c  -3 does not represent an automaton state.
c    -( b^{35, 3}_2 ∧  b^{35, 3}_1 ∧  b^{35, 3}_0 ∧ true) 
c  in CNF:
c    -b^{35, 3}_2 ∨ -b^{35, 3}_1 ∨ -b^{35, 3}_0 ∨ false 
c  in DIMACS:
-15578 -15579 -15580  0

c i = 4
c  -2+1 --> -1
c    ( b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧  p_140) -> ( b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0)
c  in CNF:
c    -b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨  b^{35, 5}_2
c    -b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_1
c    -b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨  b^{35, 5}_0
c  in DIMACS:
-15581 -15582  15583 -140  15584 0
-15581 -15582  15583 -140 -15585 0
-15581 -15582  15583 -140  15586 0

c  -1+1 --> 0
c    ( b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0 ∧  p_140) -> (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧ -b^{35, 5}_0)
c  in CNF:
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_2
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_1
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_0
c  in DIMACS:
-15581  15582 -15583 -140 -15584 0
-15581  15582 -15583 -140 -15585 0
-15581  15582 -15583 -140 -15586 0

c  0+1 --> 1
c    (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧  p_140) -> (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0)
c  in CNF:
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_2
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_1
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨  b^{35, 5}_0
c  in DIMACS:
 15581  15582  15583 -140 -15584 0
 15581  15582  15583 -140 -15585 0
 15581  15582  15583 -140  15586 0

c  1+1 --> 2
c    (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0 ∧  p_140) -> (-b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0)
c  in CNF:
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_2
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨  b^{35, 5}_1
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ -p_140 ∨ -b^{35, 5}_0
c  in DIMACS:
 15581  15582 -15583 -140 -15584 0
 15581  15582 -15583 -140  15585 0
 15581  15582 -15583 -140 -15586 0

c  2+1 --> break 
c    (-b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧  p_140) -> break
c  in CNF:
c     b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 15581 -15582  15583 -140 1162 0


c  2-1 --> 1
c    (-b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧ -p_140) -> (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0)
c  in CNF:
c     b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_2
c     b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_1
c     b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨  b^{35, 5}_0
c  in DIMACS:
 15581 -15582  15583  140 -15584 0
 15581 -15582  15583  140 -15585 0
 15581 -15582  15583  140  15586 0

c  1-1 --> 0
c    (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0 ∧ -p_140) -> (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧ -b^{35, 5}_0)
c  in CNF:
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_2
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_1
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_0
c  in DIMACS:
 15581  15582 -15583  140 -15584 0
 15581  15582 -15583  140 -15585 0
 15581  15582 -15583  140 -15586 0

c  0-1 --> -1
c    (-b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧ -p_140) -> ( b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0)
c  in CNF:
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨  b^{35, 5}_2
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_1
c     b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨  b^{35, 5}_0
c  in DIMACS:
 15581  15582  15583  140  15584 0
 15581  15582  15583  140 -15585 0
 15581  15582  15583  140  15586 0

c  -1-1 --> -2
c    ( b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧  b^{35, 4}_0 ∧ -p_140) -> ( b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0)
c  in CNF:
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨  b^{35, 5}_2
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨  b^{35, 5}_1
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨  p_140 ∨ -b^{35, 5}_0
c  in DIMACS:
-15581  15582 -15583  140  15584 0
-15581  15582 -15583  140  15585 0
-15581  15582 -15583  140 -15586 0

c  -2-1 --> break 
c    ( b^{35, 4}_2 ∧  b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨  b^{35, 4}_0 ∨  p_140 ∨ break
c  in DIMACS:
-15581 -15582  15583  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 4}_2 ∧ -b^{35, 4}_1 ∧ -b^{35, 4}_0 ∧ true) 
c  in CNF:
c    -b^{35, 4}_2 ∨  b^{35, 4}_1 ∨  b^{35, 4}_0 ∨ false 
c  in DIMACS:
-15581  15582  15583  0

c  3 does not represent an automaton state.
c    -(-b^{35, 4}_2 ∧  b^{35, 4}_1 ∧  b^{35, 4}_0 ∧ true) 
c  in CNF:
c     b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ false 
c  in DIMACS:
 15581 -15582 -15583  0
c  -3 does not represent an automaton state.
c    -( b^{35, 4}_2 ∧  b^{35, 4}_1 ∧  b^{35, 4}_0 ∧ true) 
c  in CNF:
c    -b^{35, 4}_2 ∨ -b^{35, 4}_1 ∨ -b^{35, 4}_0 ∨ false 
c  in DIMACS:
-15581 -15582 -15583  0

c i = 5
c  -2+1 --> -1
c    ( b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧  p_175) -> ( b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0)
c  in CNF:
c    -b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨  b^{35, 6}_2
c    -b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_1
c    -b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨  b^{35, 6}_0
c  in DIMACS:
-15584 -15585  15586 -175  15587 0
-15584 -15585  15586 -175 -15588 0
-15584 -15585  15586 -175  15589 0

c  -1+1 --> 0
c    ( b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0 ∧  p_175) -> (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧ -b^{35, 6}_0)
c  in CNF:
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_2
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_1
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_0
c  in DIMACS:
-15584  15585 -15586 -175 -15587 0
-15584  15585 -15586 -175 -15588 0
-15584  15585 -15586 -175 -15589 0

c  0+1 --> 1
c    (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧  p_175) -> (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0)
c  in CNF:
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_2
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_1
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨  b^{35, 6}_0
c  in DIMACS:
 15584  15585  15586 -175 -15587 0
 15584  15585  15586 -175 -15588 0
 15584  15585  15586 -175  15589 0

c  1+1 --> 2
c    (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0 ∧  p_175) -> (-b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0)
c  in CNF:
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_2
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨  b^{35, 6}_1
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ -p_175 ∨ -b^{35, 6}_0
c  in DIMACS:
 15584  15585 -15586 -175 -15587 0
 15584  15585 -15586 -175  15588 0
 15584  15585 -15586 -175 -15589 0

c  2+1 --> break 
c    (-b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧  p_175) -> break
c  in CNF:
c     b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 15584 -15585  15586 -175 1162 0


c  2-1 --> 1
c    (-b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧ -p_175) -> (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0)
c  in CNF:
c     b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_2
c     b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_1
c     b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨  b^{35, 6}_0
c  in DIMACS:
 15584 -15585  15586  175 -15587 0
 15584 -15585  15586  175 -15588 0
 15584 -15585  15586  175  15589 0

c  1-1 --> 0
c    (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0 ∧ -p_175) -> (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧ -b^{35, 6}_0)
c  in CNF:
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_2
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_1
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_0
c  in DIMACS:
 15584  15585 -15586  175 -15587 0
 15584  15585 -15586  175 -15588 0
 15584  15585 -15586  175 -15589 0

c  0-1 --> -1
c    (-b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧ -p_175) -> ( b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0)
c  in CNF:
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨  b^{35, 6}_2
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_1
c     b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨  b^{35, 6}_0
c  in DIMACS:
 15584  15585  15586  175  15587 0
 15584  15585  15586  175 -15588 0
 15584  15585  15586  175  15589 0

c  -1-1 --> -2
c    ( b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧  b^{35, 5}_0 ∧ -p_175) -> ( b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0)
c  in CNF:
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨  b^{35, 6}_2
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨  b^{35, 6}_1
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨  p_175 ∨ -b^{35, 6}_0
c  in DIMACS:
-15584  15585 -15586  175  15587 0
-15584  15585 -15586  175  15588 0
-15584  15585 -15586  175 -15589 0

c  -2-1 --> break 
c    ( b^{35, 5}_2 ∧  b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨  b^{35, 5}_0 ∨  p_175 ∨ break
c  in DIMACS:
-15584 -15585  15586  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 5}_2 ∧ -b^{35, 5}_1 ∧ -b^{35, 5}_0 ∧ true) 
c  in CNF:
c    -b^{35, 5}_2 ∨  b^{35, 5}_1 ∨  b^{35, 5}_0 ∨ false 
c  in DIMACS:
-15584  15585  15586  0

c  3 does not represent an automaton state.
c    -(-b^{35, 5}_2 ∧  b^{35, 5}_1 ∧  b^{35, 5}_0 ∧ true) 
c  in CNF:
c     b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ false 
c  in DIMACS:
 15584 -15585 -15586  0
c  -3 does not represent an automaton state.
c    -( b^{35, 5}_2 ∧  b^{35, 5}_1 ∧  b^{35, 5}_0 ∧ true) 
c  in CNF:
c    -b^{35, 5}_2 ∨ -b^{35, 5}_1 ∨ -b^{35, 5}_0 ∨ false 
c  in DIMACS:
-15584 -15585 -15586  0

c i = 6
c  -2+1 --> -1
c    ( b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧  p_210) -> ( b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0)
c  in CNF:
c    -b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨  b^{35, 7}_2
c    -b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_1
c    -b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨  b^{35, 7}_0
c  in DIMACS:
-15587 -15588  15589 -210  15590 0
-15587 -15588  15589 -210 -15591 0
-15587 -15588  15589 -210  15592 0

c  -1+1 --> 0
c    ( b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0 ∧  p_210) -> (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧ -b^{35, 7}_0)
c  in CNF:
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_2
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_1
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_0
c  in DIMACS:
-15587  15588 -15589 -210 -15590 0
-15587  15588 -15589 -210 -15591 0
-15587  15588 -15589 -210 -15592 0

c  0+1 --> 1
c    (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧  p_210) -> (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0)
c  in CNF:
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_2
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_1
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨  b^{35, 7}_0
c  in DIMACS:
 15587  15588  15589 -210 -15590 0
 15587  15588  15589 -210 -15591 0
 15587  15588  15589 -210  15592 0

c  1+1 --> 2
c    (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0 ∧  p_210) -> (-b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0)
c  in CNF:
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_2
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨  b^{35, 7}_1
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ -p_210 ∨ -b^{35, 7}_0
c  in DIMACS:
 15587  15588 -15589 -210 -15590 0
 15587  15588 -15589 -210  15591 0
 15587  15588 -15589 -210 -15592 0

c  2+1 --> break 
c    (-b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧  p_210) -> break
c  in CNF:
c     b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 15587 -15588  15589 -210 1162 0


c  2-1 --> 1
c    (-b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧ -p_210) -> (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0)
c  in CNF:
c     b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_2
c     b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_1
c     b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨  b^{35, 7}_0
c  in DIMACS:
 15587 -15588  15589  210 -15590 0
 15587 -15588  15589  210 -15591 0
 15587 -15588  15589  210  15592 0

c  1-1 --> 0
c    (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0 ∧ -p_210) -> (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧ -b^{35, 7}_0)
c  in CNF:
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_2
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_1
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_0
c  in DIMACS:
 15587  15588 -15589  210 -15590 0
 15587  15588 -15589  210 -15591 0
 15587  15588 -15589  210 -15592 0

c  0-1 --> -1
c    (-b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧ -p_210) -> ( b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0)
c  in CNF:
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨  b^{35, 7}_2
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_1
c     b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨  b^{35, 7}_0
c  in DIMACS:
 15587  15588  15589  210  15590 0
 15587  15588  15589  210 -15591 0
 15587  15588  15589  210  15592 0

c  -1-1 --> -2
c    ( b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧  b^{35, 6}_0 ∧ -p_210) -> ( b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0)
c  in CNF:
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨  b^{35, 7}_2
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨  b^{35, 7}_1
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨  p_210 ∨ -b^{35, 7}_0
c  in DIMACS:
-15587  15588 -15589  210  15590 0
-15587  15588 -15589  210  15591 0
-15587  15588 -15589  210 -15592 0

c  -2-1 --> break 
c    ( b^{35, 6}_2 ∧  b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨  b^{35, 6}_0 ∨  p_210 ∨ break
c  in DIMACS:
-15587 -15588  15589  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 6}_2 ∧ -b^{35, 6}_1 ∧ -b^{35, 6}_0 ∧ true) 
c  in CNF:
c    -b^{35, 6}_2 ∨  b^{35, 6}_1 ∨  b^{35, 6}_0 ∨ false 
c  in DIMACS:
-15587  15588  15589  0

c  3 does not represent an automaton state.
c    -(-b^{35, 6}_2 ∧  b^{35, 6}_1 ∧  b^{35, 6}_0 ∧ true) 
c  in CNF:
c     b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ false 
c  in DIMACS:
 15587 -15588 -15589  0
c  -3 does not represent an automaton state.
c    -( b^{35, 6}_2 ∧  b^{35, 6}_1 ∧  b^{35, 6}_0 ∧ true) 
c  in CNF:
c    -b^{35, 6}_2 ∨ -b^{35, 6}_1 ∨ -b^{35, 6}_0 ∨ false 
c  in DIMACS:
-15587 -15588 -15589  0

c i = 7
c  -2+1 --> -1
c    ( b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧  p_245) -> ( b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0)
c  in CNF:
c    -b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨  b^{35, 8}_2
c    -b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_1
c    -b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨  b^{35, 8}_0
c  in DIMACS:
-15590 -15591  15592 -245  15593 0
-15590 -15591  15592 -245 -15594 0
-15590 -15591  15592 -245  15595 0

c  -1+1 --> 0
c    ( b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0 ∧  p_245) -> (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧ -b^{35, 8}_0)
c  in CNF:
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_2
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_1
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_0
c  in DIMACS:
-15590  15591 -15592 -245 -15593 0
-15590  15591 -15592 -245 -15594 0
-15590  15591 -15592 -245 -15595 0

c  0+1 --> 1
c    (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧  p_245) -> (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0)
c  in CNF:
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_2
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_1
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨  b^{35, 8}_0
c  in DIMACS:
 15590  15591  15592 -245 -15593 0
 15590  15591  15592 -245 -15594 0
 15590  15591  15592 -245  15595 0

c  1+1 --> 2
c    (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0 ∧  p_245) -> (-b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0)
c  in CNF:
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_2
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨  b^{35, 8}_1
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ -p_245 ∨ -b^{35, 8}_0
c  in DIMACS:
 15590  15591 -15592 -245 -15593 0
 15590  15591 -15592 -245  15594 0
 15590  15591 -15592 -245 -15595 0

c  2+1 --> break 
c    (-b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧  p_245) -> break
c  in CNF:
c     b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 15590 -15591  15592 -245 1162 0


c  2-1 --> 1
c    (-b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧ -p_245) -> (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0)
c  in CNF:
c     b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_2
c     b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_1
c     b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨  b^{35, 8}_0
c  in DIMACS:
 15590 -15591  15592  245 -15593 0
 15590 -15591  15592  245 -15594 0
 15590 -15591  15592  245  15595 0

c  1-1 --> 0
c    (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0 ∧ -p_245) -> (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧ -b^{35, 8}_0)
c  in CNF:
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_2
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_1
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_0
c  in DIMACS:
 15590  15591 -15592  245 -15593 0
 15590  15591 -15592  245 -15594 0
 15590  15591 -15592  245 -15595 0

c  0-1 --> -1
c    (-b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧ -p_245) -> ( b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0)
c  in CNF:
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨  b^{35, 8}_2
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_1
c     b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨  b^{35, 8}_0
c  in DIMACS:
 15590  15591  15592  245  15593 0
 15590  15591  15592  245 -15594 0
 15590  15591  15592  245  15595 0

c  -1-1 --> -2
c    ( b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧  b^{35, 7}_0 ∧ -p_245) -> ( b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0)
c  in CNF:
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨  b^{35, 8}_2
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨  b^{35, 8}_1
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨  p_245 ∨ -b^{35, 8}_0
c  in DIMACS:
-15590  15591 -15592  245  15593 0
-15590  15591 -15592  245  15594 0
-15590  15591 -15592  245 -15595 0

c  -2-1 --> break 
c    ( b^{35, 7}_2 ∧  b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨  b^{35, 7}_0 ∨  p_245 ∨ break
c  in DIMACS:
-15590 -15591  15592  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 7}_2 ∧ -b^{35, 7}_1 ∧ -b^{35, 7}_0 ∧ true) 
c  in CNF:
c    -b^{35, 7}_2 ∨  b^{35, 7}_1 ∨  b^{35, 7}_0 ∨ false 
c  in DIMACS:
-15590  15591  15592  0

c  3 does not represent an automaton state.
c    -(-b^{35, 7}_2 ∧  b^{35, 7}_1 ∧  b^{35, 7}_0 ∧ true) 
c  in CNF:
c     b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ false 
c  in DIMACS:
 15590 -15591 -15592  0
c  -3 does not represent an automaton state.
c    -( b^{35, 7}_2 ∧  b^{35, 7}_1 ∧  b^{35, 7}_0 ∧ true) 
c  in CNF:
c    -b^{35, 7}_2 ∨ -b^{35, 7}_1 ∨ -b^{35, 7}_0 ∨ false 
c  in DIMACS:
-15590 -15591 -15592  0

c i = 8
c  -2+1 --> -1
c    ( b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧  p_280) -> ( b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0)
c  in CNF:
c    -b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨  b^{35, 9}_2
c    -b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_1
c    -b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨  b^{35, 9}_0
c  in DIMACS:
-15593 -15594  15595 -280  15596 0
-15593 -15594  15595 -280 -15597 0
-15593 -15594  15595 -280  15598 0

c  -1+1 --> 0
c    ( b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0 ∧  p_280) -> (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧ -b^{35, 9}_0)
c  in CNF:
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_2
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_1
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_0
c  in DIMACS:
-15593  15594 -15595 -280 -15596 0
-15593  15594 -15595 -280 -15597 0
-15593  15594 -15595 -280 -15598 0

c  0+1 --> 1
c    (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧  p_280) -> (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0)
c  in CNF:
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_2
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_1
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨  b^{35, 9}_0
c  in DIMACS:
 15593  15594  15595 -280 -15596 0
 15593  15594  15595 -280 -15597 0
 15593  15594  15595 -280  15598 0

c  1+1 --> 2
c    (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0 ∧  p_280) -> (-b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0)
c  in CNF:
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_2
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨  b^{35, 9}_1
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ -p_280 ∨ -b^{35, 9}_0
c  in DIMACS:
 15593  15594 -15595 -280 -15596 0
 15593  15594 -15595 -280  15597 0
 15593  15594 -15595 -280 -15598 0

c  2+1 --> break 
c    (-b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧  p_280) -> break
c  in CNF:
c     b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 15593 -15594  15595 -280 1162 0


c  2-1 --> 1
c    (-b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧ -p_280) -> (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0)
c  in CNF:
c     b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_2
c     b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_1
c     b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨  b^{35, 9}_0
c  in DIMACS:
 15593 -15594  15595  280 -15596 0
 15593 -15594  15595  280 -15597 0
 15593 -15594  15595  280  15598 0

c  1-1 --> 0
c    (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0 ∧ -p_280) -> (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧ -b^{35, 9}_0)
c  in CNF:
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_2
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_1
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_0
c  in DIMACS:
 15593  15594 -15595  280 -15596 0
 15593  15594 -15595  280 -15597 0
 15593  15594 -15595  280 -15598 0

c  0-1 --> -1
c    (-b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧ -p_280) -> ( b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0)
c  in CNF:
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨  b^{35, 9}_2
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_1
c     b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨  b^{35, 9}_0
c  in DIMACS:
 15593  15594  15595  280  15596 0
 15593  15594  15595  280 -15597 0
 15593  15594  15595  280  15598 0

c  -1-1 --> -2
c    ( b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧  b^{35, 8}_0 ∧ -p_280) -> ( b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0)
c  in CNF:
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨  b^{35, 9}_2
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨  b^{35, 9}_1
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨  p_280 ∨ -b^{35, 9}_0
c  in DIMACS:
-15593  15594 -15595  280  15596 0
-15593  15594 -15595  280  15597 0
-15593  15594 -15595  280 -15598 0

c  -2-1 --> break 
c    ( b^{35, 8}_2 ∧  b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨  b^{35, 8}_0 ∨  p_280 ∨ break
c  in DIMACS:
-15593 -15594  15595  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 8}_2 ∧ -b^{35, 8}_1 ∧ -b^{35, 8}_0 ∧ true) 
c  in CNF:
c    -b^{35, 8}_2 ∨  b^{35, 8}_1 ∨  b^{35, 8}_0 ∨ false 
c  in DIMACS:
-15593  15594  15595  0

c  3 does not represent an automaton state.
c    -(-b^{35, 8}_2 ∧  b^{35, 8}_1 ∧  b^{35, 8}_0 ∧ true) 
c  in CNF:
c     b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ false 
c  in DIMACS:
 15593 -15594 -15595  0
c  -3 does not represent an automaton state.
c    -( b^{35, 8}_2 ∧  b^{35, 8}_1 ∧  b^{35, 8}_0 ∧ true) 
c  in CNF:
c    -b^{35, 8}_2 ∨ -b^{35, 8}_1 ∨ -b^{35, 8}_0 ∨ false 
c  in DIMACS:
-15593 -15594 -15595  0

c i = 9
c  -2+1 --> -1
c    ( b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧  p_315) -> ( b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0)
c  in CNF:
c    -b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨  b^{35, 10}_2
c    -b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_1
c    -b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨  b^{35, 10}_0
c  in DIMACS:
-15596 -15597  15598 -315  15599 0
-15596 -15597  15598 -315 -15600 0
-15596 -15597  15598 -315  15601 0

c  -1+1 --> 0
c    ( b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0 ∧  p_315) -> (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧ -b^{35, 10}_0)
c  in CNF:
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_2
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_1
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_0
c  in DIMACS:
-15596  15597 -15598 -315 -15599 0
-15596  15597 -15598 -315 -15600 0
-15596  15597 -15598 -315 -15601 0

c  0+1 --> 1
c    (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧  p_315) -> (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0)
c  in CNF:
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_2
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_1
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨  b^{35, 10}_0
c  in DIMACS:
 15596  15597  15598 -315 -15599 0
 15596  15597  15598 -315 -15600 0
 15596  15597  15598 -315  15601 0

c  1+1 --> 2
c    (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0 ∧  p_315) -> (-b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0)
c  in CNF:
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_2
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨  b^{35, 10}_1
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ -p_315 ∨ -b^{35, 10}_0
c  in DIMACS:
 15596  15597 -15598 -315 -15599 0
 15596  15597 -15598 -315  15600 0
 15596  15597 -15598 -315 -15601 0

c  2+1 --> break 
c    (-b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧  p_315) -> break
c  in CNF:
c     b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 15596 -15597  15598 -315 1162 0


c  2-1 --> 1
c    (-b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧ -p_315) -> (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0)
c  in CNF:
c     b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_2
c     b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_1
c     b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨  b^{35, 10}_0
c  in DIMACS:
 15596 -15597  15598  315 -15599 0
 15596 -15597  15598  315 -15600 0
 15596 -15597  15598  315  15601 0

c  1-1 --> 0
c    (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0 ∧ -p_315) -> (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧ -b^{35, 10}_0)
c  in CNF:
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_2
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_1
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_0
c  in DIMACS:
 15596  15597 -15598  315 -15599 0
 15596  15597 -15598  315 -15600 0
 15596  15597 -15598  315 -15601 0

c  0-1 --> -1
c    (-b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧ -p_315) -> ( b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0)
c  in CNF:
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨  b^{35, 10}_2
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_1
c     b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨  b^{35, 10}_0
c  in DIMACS:
 15596  15597  15598  315  15599 0
 15596  15597  15598  315 -15600 0
 15596  15597  15598  315  15601 0

c  -1-1 --> -2
c    ( b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧  b^{35, 9}_0 ∧ -p_315) -> ( b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0)
c  in CNF:
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨  b^{35, 10}_2
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨  b^{35, 10}_1
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨  p_315 ∨ -b^{35, 10}_0
c  in DIMACS:
-15596  15597 -15598  315  15599 0
-15596  15597 -15598  315  15600 0
-15596  15597 -15598  315 -15601 0

c  -2-1 --> break 
c    ( b^{35, 9}_2 ∧  b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨  b^{35, 9}_0 ∨  p_315 ∨ break
c  in DIMACS:
-15596 -15597  15598  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 9}_2 ∧ -b^{35, 9}_1 ∧ -b^{35, 9}_0 ∧ true) 
c  in CNF:
c    -b^{35, 9}_2 ∨  b^{35, 9}_1 ∨  b^{35, 9}_0 ∨ false 
c  in DIMACS:
-15596  15597  15598  0

c  3 does not represent an automaton state.
c    -(-b^{35, 9}_2 ∧  b^{35, 9}_1 ∧  b^{35, 9}_0 ∧ true) 
c  in CNF:
c     b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ false 
c  in DIMACS:
 15596 -15597 -15598  0
c  -3 does not represent an automaton state.
c    -( b^{35, 9}_2 ∧  b^{35, 9}_1 ∧  b^{35, 9}_0 ∧ true) 
c  in CNF:
c    -b^{35, 9}_2 ∨ -b^{35, 9}_1 ∨ -b^{35, 9}_0 ∨ false 
c  in DIMACS:
-15596 -15597 -15598  0

c i = 10
c  -2+1 --> -1
c    ( b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧  p_350) -> ( b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0)
c  in CNF:
c    -b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨  b^{35, 11}_2
c    -b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_1
c    -b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨  b^{35, 11}_0
c  in DIMACS:
-15599 -15600  15601 -350  15602 0
-15599 -15600  15601 -350 -15603 0
-15599 -15600  15601 -350  15604 0

c  -1+1 --> 0
c    ( b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0 ∧  p_350) -> (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧ -b^{35, 11}_0)
c  in CNF:
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_2
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_1
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_0
c  in DIMACS:
-15599  15600 -15601 -350 -15602 0
-15599  15600 -15601 -350 -15603 0
-15599  15600 -15601 -350 -15604 0

c  0+1 --> 1
c    (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧  p_350) -> (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0)
c  in CNF:
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_2
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_1
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨  b^{35, 11}_0
c  in DIMACS:
 15599  15600  15601 -350 -15602 0
 15599  15600  15601 -350 -15603 0
 15599  15600  15601 -350  15604 0

c  1+1 --> 2
c    (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0 ∧  p_350) -> (-b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0)
c  in CNF:
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_2
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨  b^{35, 11}_1
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ -p_350 ∨ -b^{35, 11}_0
c  in DIMACS:
 15599  15600 -15601 -350 -15602 0
 15599  15600 -15601 -350  15603 0
 15599  15600 -15601 -350 -15604 0

c  2+1 --> break 
c    (-b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧  p_350) -> break
c  in CNF:
c     b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 15599 -15600  15601 -350 1162 0


c  2-1 --> 1
c    (-b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧ -p_350) -> (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0)
c  in CNF:
c     b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_2
c     b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_1
c     b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨  b^{35, 11}_0
c  in DIMACS:
 15599 -15600  15601  350 -15602 0
 15599 -15600  15601  350 -15603 0
 15599 -15600  15601  350  15604 0

c  1-1 --> 0
c    (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0 ∧ -p_350) -> (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧ -b^{35, 11}_0)
c  in CNF:
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_2
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_1
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_0
c  in DIMACS:
 15599  15600 -15601  350 -15602 0
 15599  15600 -15601  350 -15603 0
 15599  15600 -15601  350 -15604 0

c  0-1 --> -1
c    (-b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧ -p_350) -> ( b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0)
c  in CNF:
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨  b^{35, 11}_2
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_1
c     b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨  b^{35, 11}_0
c  in DIMACS:
 15599  15600  15601  350  15602 0
 15599  15600  15601  350 -15603 0
 15599  15600  15601  350  15604 0

c  -1-1 --> -2
c    ( b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧  b^{35, 10}_0 ∧ -p_350) -> ( b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0)
c  in CNF:
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨  b^{35, 11}_2
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨  b^{35, 11}_1
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨  p_350 ∨ -b^{35, 11}_0
c  in DIMACS:
-15599  15600 -15601  350  15602 0
-15599  15600 -15601  350  15603 0
-15599  15600 -15601  350 -15604 0

c  -2-1 --> break 
c    ( b^{35, 10}_2 ∧  b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨  b^{35, 10}_0 ∨  p_350 ∨ break
c  in DIMACS:
-15599 -15600  15601  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 10}_2 ∧ -b^{35, 10}_1 ∧ -b^{35, 10}_0 ∧ true) 
c  in CNF:
c    -b^{35, 10}_2 ∨  b^{35, 10}_1 ∨  b^{35, 10}_0 ∨ false 
c  in DIMACS:
-15599  15600  15601  0

c  3 does not represent an automaton state.
c    -(-b^{35, 10}_2 ∧  b^{35, 10}_1 ∧  b^{35, 10}_0 ∧ true) 
c  in CNF:
c     b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ false 
c  in DIMACS:
 15599 -15600 -15601  0
c  -3 does not represent an automaton state.
c    -( b^{35, 10}_2 ∧  b^{35, 10}_1 ∧  b^{35, 10}_0 ∧ true) 
c  in CNF:
c    -b^{35, 10}_2 ∨ -b^{35, 10}_1 ∨ -b^{35, 10}_0 ∨ false 
c  in DIMACS:
-15599 -15600 -15601  0

c i = 11
c  -2+1 --> -1
c    ( b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧  p_385) -> ( b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0)
c  in CNF:
c    -b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨  b^{35, 12}_2
c    -b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_1
c    -b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨  b^{35, 12}_0
c  in DIMACS:
-15602 -15603  15604 -385  15605 0
-15602 -15603  15604 -385 -15606 0
-15602 -15603  15604 -385  15607 0

c  -1+1 --> 0
c    ( b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0 ∧  p_385) -> (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧ -b^{35, 12}_0)
c  in CNF:
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_2
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_1
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_0
c  in DIMACS:
-15602  15603 -15604 -385 -15605 0
-15602  15603 -15604 -385 -15606 0
-15602  15603 -15604 -385 -15607 0

c  0+1 --> 1
c    (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧  p_385) -> (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0)
c  in CNF:
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_2
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_1
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨  b^{35, 12}_0
c  in DIMACS:
 15602  15603  15604 -385 -15605 0
 15602  15603  15604 -385 -15606 0
 15602  15603  15604 -385  15607 0

c  1+1 --> 2
c    (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0 ∧  p_385) -> (-b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0)
c  in CNF:
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_2
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨  b^{35, 12}_1
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ -p_385 ∨ -b^{35, 12}_0
c  in DIMACS:
 15602  15603 -15604 -385 -15605 0
 15602  15603 -15604 -385  15606 0
 15602  15603 -15604 -385 -15607 0

c  2+1 --> break 
c    (-b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧  p_385) -> break
c  in CNF:
c     b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 15602 -15603  15604 -385 1162 0


c  2-1 --> 1
c    (-b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧ -p_385) -> (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0)
c  in CNF:
c     b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_2
c     b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_1
c     b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨  b^{35, 12}_0
c  in DIMACS:
 15602 -15603  15604  385 -15605 0
 15602 -15603  15604  385 -15606 0
 15602 -15603  15604  385  15607 0

c  1-1 --> 0
c    (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0 ∧ -p_385) -> (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧ -b^{35, 12}_0)
c  in CNF:
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_2
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_1
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_0
c  in DIMACS:
 15602  15603 -15604  385 -15605 0
 15602  15603 -15604  385 -15606 0
 15602  15603 -15604  385 -15607 0

c  0-1 --> -1
c    (-b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧ -p_385) -> ( b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0)
c  in CNF:
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨  b^{35, 12}_2
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_1
c     b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨  b^{35, 12}_0
c  in DIMACS:
 15602  15603  15604  385  15605 0
 15602  15603  15604  385 -15606 0
 15602  15603  15604  385  15607 0

c  -1-1 --> -2
c    ( b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧  b^{35, 11}_0 ∧ -p_385) -> ( b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0)
c  in CNF:
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨  b^{35, 12}_2
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨  b^{35, 12}_1
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨  p_385 ∨ -b^{35, 12}_0
c  in DIMACS:
-15602  15603 -15604  385  15605 0
-15602  15603 -15604  385  15606 0
-15602  15603 -15604  385 -15607 0

c  -2-1 --> break 
c    ( b^{35, 11}_2 ∧  b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨  b^{35, 11}_0 ∨  p_385 ∨ break
c  in DIMACS:
-15602 -15603  15604  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 11}_2 ∧ -b^{35, 11}_1 ∧ -b^{35, 11}_0 ∧ true) 
c  in CNF:
c    -b^{35, 11}_2 ∨  b^{35, 11}_1 ∨  b^{35, 11}_0 ∨ false 
c  in DIMACS:
-15602  15603  15604  0

c  3 does not represent an automaton state.
c    -(-b^{35, 11}_2 ∧  b^{35, 11}_1 ∧  b^{35, 11}_0 ∧ true) 
c  in CNF:
c     b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ false 
c  in DIMACS:
 15602 -15603 -15604  0
c  -3 does not represent an automaton state.
c    -( b^{35, 11}_2 ∧  b^{35, 11}_1 ∧  b^{35, 11}_0 ∧ true) 
c  in CNF:
c    -b^{35, 11}_2 ∨ -b^{35, 11}_1 ∨ -b^{35, 11}_0 ∨ false 
c  in DIMACS:
-15602 -15603 -15604  0

c i = 12
c  -2+1 --> -1
c    ( b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧  p_420) -> ( b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0)
c  in CNF:
c    -b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨  b^{35, 13}_2
c    -b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_1
c    -b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨  b^{35, 13}_0
c  in DIMACS:
-15605 -15606  15607 -420  15608 0
-15605 -15606  15607 -420 -15609 0
-15605 -15606  15607 -420  15610 0

c  -1+1 --> 0
c    ( b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0 ∧  p_420) -> (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧ -b^{35, 13}_0)
c  in CNF:
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_2
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_1
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_0
c  in DIMACS:
-15605  15606 -15607 -420 -15608 0
-15605  15606 -15607 -420 -15609 0
-15605  15606 -15607 -420 -15610 0

c  0+1 --> 1
c    (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧  p_420) -> (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0)
c  in CNF:
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_2
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_1
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨  b^{35, 13}_0
c  in DIMACS:
 15605  15606  15607 -420 -15608 0
 15605  15606  15607 -420 -15609 0
 15605  15606  15607 -420  15610 0

c  1+1 --> 2
c    (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0 ∧  p_420) -> (-b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0)
c  in CNF:
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_2
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨  b^{35, 13}_1
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ -p_420 ∨ -b^{35, 13}_0
c  in DIMACS:
 15605  15606 -15607 -420 -15608 0
 15605  15606 -15607 -420  15609 0
 15605  15606 -15607 -420 -15610 0

c  2+1 --> break 
c    (-b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧  p_420) -> break
c  in CNF:
c     b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 15605 -15606  15607 -420 1162 0


c  2-1 --> 1
c    (-b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧ -p_420) -> (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0)
c  in CNF:
c     b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_2
c     b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_1
c     b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨  b^{35, 13}_0
c  in DIMACS:
 15605 -15606  15607  420 -15608 0
 15605 -15606  15607  420 -15609 0
 15605 -15606  15607  420  15610 0

c  1-1 --> 0
c    (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0 ∧ -p_420) -> (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧ -b^{35, 13}_0)
c  in CNF:
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_2
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_1
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_0
c  in DIMACS:
 15605  15606 -15607  420 -15608 0
 15605  15606 -15607  420 -15609 0
 15605  15606 -15607  420 -15610 0

c  0-1 --> -1
c    (-b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧ -p_420) -> ( b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0)
c  in CNF:
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨  b^{35, 13}_2
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_1
c     b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨  b^{35, 13}_0
c  in DIMACS:
 15605  15606  15607  420  15608 0
 15605  15606  15607  420 -15609 0
 15605  15606  15607  420  15610 0

c  -1-1 --> -2
c    ( b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧  b^{35, 12}_0 ∧ -p_420) -> ( b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0)
c  in CNF:
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨  b^{35, 13}_2
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨  b^{35, 13}_1
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨  p_420 ∨ -b^{35, 13}_0
c  in DIMACS:
-15605  15606 -15607  420  15608 0
-15605  15606 -15607  420  15609 0
-15605  15606 -15607  420 -15610 0

c  -2-1 --> break 
c    ( b^{35, 12}_2 ∧  b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨  b^{35, 12}_0 ∨  p_420 ∨ break
c  in DIMACS:
-15605 -15606  15607  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 12}_2 ∧ -b^{35, 12}_1 ∧ -b^{35, 12}_0 ∧ true) 
c  in CNF:
c    -b^{35, 12}_2 ∨  b^{35, 12}_1 ∨  b^{35, 12}_0 ∨ false 
c  in DIMACS:
-15605  15606  15607  0

c  3 does not represent an automaton state.
c    -(-b^{35, 12}_2 ∧  b^{35, 12}_1 ∧  b^{35, 12}_0 ∧ true) 
c  in CNF:
c     b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ false 
c  in DIMACS:
 15605 -15606 -15607  0
c  -3 does not represent an automaton state.
c    -( b^{35, 12}_2 ∧  b^{35, 12}_1 ∧  b^{35, 12}_0 ∧ true) 
c  in CNF:
c    -b^{35, 12}_2 ∨ -b^{35, 12}_1 ∨ -b^{35, 12}_0 ∨ false 
c  in DIMACS:
-15605 -15606 -15607  0

c i = 13
c  -2+1 --> -1
c    ( b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧  p_455) -> ( b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0)
c  in CNF:
c    -b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨  b^{35, 14}_2
c    -b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_1
c    -b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨  b^{35, 14}_0
c  in DIMACS:
-15608 -15609  15610 -455  15611 0
-15608 -15609  15610 -455 -15612 0
-15608 -15609  15610 -455  15613 0

c  -1+1 --> 0
c    ( b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0 ∧  p_455) -> (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧ -b^{35, 14}_0)
c  in CNF:
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_2
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_1
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_0
c  in DIMACS:
-15608  15609 -15610 -455 -15611 0
-15608  15609 -15610 -455 -15612 0
-15608  15609 -15610 -455 -15613 0

c  0+1 --> 1
c    (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧  p_455) -> (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0)
c  in CNF:
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_2
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_1
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨  b^{35, 14}_0
c  in DIMACS:
 15608  15609  15610 -455 -15611 0
 15608  15609  15610 -455 -15612 0
 15608  15609  15610 -455  15613 0

c  1+1 --> 2
c    (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0 ∧  p_455) -> (-b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0)
c  in CNF:
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_2
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨  b^{35, 14}_1
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ -p_455 ∨ -b^{35, 14}_0
c  in DIMACS:
 15608  15609 -15610 -455 -15611 0
 15608  15609 -15610 -455  15612 0
 15608  15609 -15610 -455 -15613 0

c  2+1 --> break 
c    (-b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧  p_455) -> break
c  in CNF:
c     b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 15608 -15609  15610 -455 1162 0


c  2-1 --> 1
c    (-b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧ -p_455) -> (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0)
c  in CNF:
c     b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_2
c     b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_1
c     b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨  b^{35, 14}_0
c  in DIMACS:
 15608 -15609  15610  455 -15611 0
 15608 -15609  15610  455 -15612 0
 15608 -15609  15610  455  15613 0

c  1-1 --> 0
c    (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0 ∧ -p_455) -> (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧ -b^{35, 14}_0)
c  in CNF:
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_2
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_1
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_0
c  in DIMACS:
 15608  15609 -15610  455 -15611 0
 15608  15609 -15610  455 -15612 0
 15608  15609 -15610  455 -15613 0

c  0-1 --> -1
c    (-b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧ -p_455) -> ( b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0)
c  in CNF:
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨  b^{35, 14}_2
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_1
c     b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨  b^{35, 14}_0
c  in DIMACS:
 15608  15609  15610  455  15611 0
 15608  15609  15610  455 -15612 0
 15608  15609  15610  455  15613 0

c  -1-1 --> -2
c    ( b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧  b^{35, 13}_0 ∧ -p_455) -> ( b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0)
c  in CNF:
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨  b^{35, 14}_2
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨  b^{35, 14}_1
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨  p_455 ∨ -b^{35, 14}_0
c  in DIMACS:
-15608  15609 -15610  455  15611 0
-15608  15609 -15610  455  15612 0
-15608  15609 -15610  455 -15613 0

c  -2-1 --> break 
c    ( b^{35, 13}_2 ∧  b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨  b^{35, 13}_0 ∨  p_455 ∨ break
c  in DIMACS:
-15608 -15609  15610  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 13}_2 ∧ -b^{35, 13}_1 ∧ -b^{35, 13}_0 ∧ true) 
c  in CNF:
c    -b^{35, 13}_2 ∨  b^{35, 13}_1 ∨  b^{35, 13}_0 ∨ false 
c  in DIMACS:
-15608  15609  15610  0

c  3 does not represent an automaton state.
c    -(-b^{35, 13}_2 ∧  b^{35, 13}_1 ∧  b^{35, 13}_0 ∧ true) 
c  in CNF:
c     b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ false 
c  in DIMACS:
 15608 -15609 -15610  0
c  -3 does not represent an automaton state.
c    -( b^{35, 13}_2 ∧  b^{35, 13}_1 ∧  b^{35, 13}_0 ∧ true) 
c  in CNF:
c    -b^{35, 13}_2 ∨ -b^{35, 13}_1 ∨ -b^{35, 13}_0 ∨ false 
c  in DIMACS:
-15608 -15609 -15610  0

c i = 14
c  -2+1 --> -1
c    ( b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧  p_490) -> ( b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0)
c  in CNF:
c    -b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨  b^{35, 15}_2
c    -b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_1
c    -b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨  b^{35, 15}_0
c  in DIMACS:
-15611 -15612  15613 -490  15614 0
-15611 -15612  15613 -490 -15615 0
-15611 -15612  15613 -490  15616 0

c  -1+1 --> 0
c    ( b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0 ∧  p_490) -> (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧ -b^{35, 15}_0)
c  in CNF:
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_2
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_1
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_0
c  in DIMACS:
-15611  15612 -15613 -490 -15614 0
-15611  15612 -15613 -490 -15615 0
-15611  15612 -15613 -490 -15616 0

c  0+1 --> 1
c    (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧  p_490) -> (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0)
c  in CNF:
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_2
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_1
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨  b^{35, 15}_0
c  in DIMACS:
 15611  15612  15613 -490 -15614 0
 15611  15612  15613 -490 -15615 0
 15611  15612  15613 -490  15616 0

c  1+1 --> 2
c    (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0 ∧  p_490) -> (-b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0)
c  in CNF:
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_2
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨  b^{35, 15}_1
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ -p_490 ∨ -b^{35, 15}_0
c  in DIMACS:
 15611  15612 -15613 -490 -15614 0
 15611  15612 -15613 -490  15615 0
 15611  15612 -15613 -490 -15616 0

c  2+1 --> break 
c    (-b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧  p_490) -> break
c  in CNF:
c     b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 15611 -15612  15613 -490 1162 0


c  2-1 --> 1
c    (-b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧ -p_490) -> (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0)
c  in CNF:
c     b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_2
c     b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_1
c     b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨  b^{35, 15}_0
c  in DIMACS:
 15611 -15612  15613  490 -15614 0
 15611 -15612  15613  490 -15615 0
 15611 -15612  15613  490  15616 0

c  1-1 --> 0
c    (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0 ∧ -p_490) -> (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧ -b^{35, 15}_0)
c  in CNF:
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_2
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_1
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_0
c  in DIMACS:
 15611  15612 -15613  490 -15614 0
 15611  15612 -15613  490 -15615 0
 15611  15612 -15613  490 -15616 0

c  0-1 --> -1
c    (-b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧ -p_490) -> ( b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0)
c  in CNF:
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨  b^{35, 15}_2
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_1
c     b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨  b^{35, 15}_0
c  in DIMACS:
 15611  15612  15613  490  15614 0
 15611  15612  15613  490 -15615 0
 15611  15612  15613  490  15616 0

c  -1-1 --> -2
c    ( b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧  b^{35, 14}_0 ∧ -p_490) -> ( b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0)
c  in CNF:
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨  b^{35, 15}_2
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨  b^{35, 15}_1
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨  p_490 ∨ -b^{35, 15}_0
c  in DIMACS:
-15611  15612 -15613  490  15614 0
-15611  15612 -15613  490  15615 0
-15611  15612 -15613  490 -15616 0

c  -2-1 --> break 
c    ( b^{35, 14}_2 ∧  b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨  b^{35, 14}_0 ∨  p_490 ∨ break
c  in DIMACS:
-15611 -15612  15613  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 14}_2 ∧ -b^{35, 14}_1 ∧ -b^{35, 14}_0 ∧ true) 
c  in CNF:
c    -b^{35, 14}_2 ∨  b^{35, 14}_1 ∨  b^{35, 14}_0 ∨ false 
c  in DIMACS:
-15611  15612  15613  0

c  3 does not represent an automaton state.
c    -(-b^{35, 14}_2 ∧  b^{35, 14}_1 ∧  b^{35, 14}_0 ∧ true) 
c  in CNF:
c     b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ false 
c  in DIMACS:
 15611 -15612 -15613  0
c  -3 does not represent an automaton state.
c    -( b^{35, 14}_2 ∧  b^{35, 14}_1 ∧  b^{35, 14}_0 ∧ true) 
c  in CNF:
c    -b^{35, 14}_2 ∨ -b^{35, 14}_1 ∨ -b^{35, 14}_0 ∨ false 
c  in DIMACS:
-15611 -15612 -15613  0

c i = 15
c  -2+1 --> -1
c    ( b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧  p_525) -> ( b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0)
c  in CNF:
c    -b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨  b^{35, 16}_2
c    -b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_1
c    -b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨  b^{35, 16}_0
c  in DIMACS:
-15614 -15615  15616 -525  15617 0
-15614 -15615  15616 -525 -15618 0
-15614 -15615  15616 -525  15619 0

c  -1+1 --> 0
c    ( b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0 ∧  p_525) -> (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧ -b^{35, 16}_0)
c  in CNF:
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_2
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_1
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_0
c  in DIMACS:
-15614  15615 -15616 -525 -15617 0
-15614  15615 -15616 -525 -15618 0
-15614  15615 -15616 -525 -15619 0

c  0+1 --> 1
c    (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧  p_525) -> (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0)
c  in CNF:
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_2
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_1
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨  b^{35, 16}_0
c  in DIMACS:
 15614  15615  15616 -525 -15617 0
 15614  15615  15616 -525 -15618 0
 15614  15615  15616 -525  15619 0

c  1+1 --> 2
c    (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0 ∧  p_525) -> (-b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0)
c  in CNF:
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_2
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨  b^{35, 16}_1
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ -p_525 ∨ -b^{35, 16}_0
c  in DIMACS:
 15614  15615 -15616 -525 -15617 0
 15614  15615 -15616 -525  15618 0
 15614  15615 -15616 -525 -15619 0

c  2+1 --> break 
c    (-b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧  p_525) -> break
c  in CNF:
c     b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 15614 -15615  15616 -525 1162 0


c  2-1 --> 1
c    (-b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧ -p_525) -> (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0)
c  in CNF:
c     b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_2
c     b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_1
c     b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨  b^{35, 16}_0
c  in DIMACS:
 15614 -15615  15616  525 -15617 0
 15614 -15615  15616  525 -15618 0
 15614 -15615  15616  525  15619 0

c  1-1 --> 0
c    (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0 ∧ -p_525) -> (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧ -b^{35, 16}_0)
c  in CNF:
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_2
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_1
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_0
c  in DIMACS:
 15614  15615 -15616  525 -15617 0
 15614  15615 -15616  525 -15618 0
 15614  15615 -15616  525 -15619 0

c  0-1 --> -1
c    (-b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧ -p_525) -> ( b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0)
c  in CNF:
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨  b^{35, 16}_2
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_1
c     b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨  b^{35, 16}_0
c  in DIMACS:
 15614  15615  15616  525  15617 0
 15614  15615  15616  525 -15618 0
 15614  15615  15616  525  15619 0

c  -1-1 --> -2
c    ( b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧  b^{35, 15}_0 ∧ -p_525) -> ( b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0)
c  in CNF:
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨  b^{35, 16}_2
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨  b^{35, 16}_1
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨  p_525 ∨ -b^{35, 16}_0
c  in DIMACS:
-15614  15615 -15616  525  15617 0
-15614  15615 -15616  525  15618 0
-15614  15615 -15616  525 -15619 0

c  -2-1 --> break 
c    ( b^{35, 15}_2 ∧  b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨  b^{35, 15}_0 ∨  p_525 ∨ break
c  in DIMACS:
-15614 -15615  15616  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 15}_2 ∧ -b^{35, 15}_1 ∧ -b^{35, 15}_0 ∧ true) 
c  in CNF:
c    -b^{35, 15}_2 ∨  b^{35, 15}_1 ∨  b^{35, 15}_0 ∨ false 
c  in DIMACS:
-15614  15615  15616  0

c  3 does not represent an automaton state.
c    -(-b^{35, 15}_2 ∧  b^{35, 15}_1 ∧  b^{35, 15}_0 ∧ true) 
c  in CNF:
c     b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ false 
c  in DIMACS:
 15614 -15615 -15616  0
c  -3 does not represent an automaton state.
c    -( b^{35, 15}_2 ∧  b^{35, 15}_1 ∧  b^{35, 15}_0 ∧ true) 
c  in CNF:
c    -b^{35, 15}_2 ∨ -b^{35, 15}_1 ∨ -b^{35, 15}_0 ∨ false 
c  in DIMACS:
-15614 -15615 -15616  0

c i = 16
c  -2+1 --> -1
c    ( b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧  p_560) -> ( b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0)
c  in CNF:
c    -b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨  b^{35, 17}_2
c    -b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_1
c    -b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨  b^{35, 17}_0
c  in DIMACS:
-15617 -15618  15619 -560  15620 0
-15617 -15618  15619 -560 -15621 0
-15617 -15618  15619 -560  15622 0

c  -1+1 --> 0
c    ( b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0 ∧  p_560) -> (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧ -b^{35, 17}_0)
c  in CNF:
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_2
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_1
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_0
c  in DIMACS:
-15617  15618 -15619 -560 -15620 0
-15617  15618 -15619 -560 -15621 0
-15617  15618 -15619 -560 -15622 0

c  0+1 --> 1
c    (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧  p_560) -> (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0)
c  in CNF:
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_2
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_1
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨  b^{35, 17}_0
c  in DIMACS:
 15617  15618  15619 -560 -15620 0
 15617  15618  15619 -560 -15621 0
 15617  15618  15619 -560  15622 0

c  1+1 --> 2
c    (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0 ∧  p_560) -> (-b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0)
c  in CNF:
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_2
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨  b^{35, 17}_1
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ -p_560 ∨ -b^{35, 17}_0
c  in DIMACS:
 15617  15618 -15619 -560 -15620 0
 15617  15618 -15619 -560  15621 0
 15617  15618 -15619 -560 -15622 0

c  2+1 --> break 
c    (-b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧  p_560) -> break
c  in CNF:
c     b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 15617 -15618  15619 -560 1162 0


c  2-1 --> 1
c    (-b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧ -p_560) -> (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0)
c  in CNF:
c     b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_2
c     b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_1
c     b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨  b^{35, 17}_0
c  in DIMACS:
 15617 -15618  15619  560 -15620 0
 15617 -15618  15619  560 -15621 0
 15617 -15618  15619  560  15622 0

c  1-1 --> 0
c    (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0 ∧ -p_560) -> (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧ -b^{35, 17}_0)
c  in CNF:
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_2
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_1
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_0
c  in DIMACS:
 15617  15618 -15619  560 -15620 0
 15617  15618 -15619  560 -15621 0
 15617  15618 -15619  560 -15622 0

c  0-1 --> -1
c    (-b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧ -p_560) -> ( b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0)
c  in CNF:
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨  b^{35, 17}_2
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_1
c     b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨  b^{35, 17}_0
c  in DIMACS:
 15617  15618  15619  560  15620 0
 15617  15618  15619  560 -15621 0
 15617  15618  15619  560  15622 0

c  -1-1 --> -2
c    ( b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧  b^{35, 16}_0 ∧ -p_560) -> ( b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0)
c  in CNF:
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨  b^{35, 17}_2
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨  b^{35, 17}_1
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨  p_560 ∨ -b^{35, 17}_0
c  in DIMACS:
-15617  15618 -15619  560  15620 0
-15617  15618 -15619  560  15621 0
-15617  15618 -15619  560 -15622 0

c  -2-1 --> break 
c    ( b^{35, 16}_2 ∧  b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨  b^{35, 16}_0 ∨  p_560 ∨ break
c  in DIMACS:
-15617 -15618  15619  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 16}_2 ∧ -b^{35, 16}_1 ∧ -b^{35, 16}_0 ∧ true) 
c  in CNF:
c    -b^{35, 16}_2 ∨  b^{35, 16}_1 ∨  b^{35, 16}_0 ∨ false 
c  in DIMACS:
-15617  15618  15619  0

c  3 does not represent an automaton state.
c    -(-b^{35, 16}_2 ∧  b^{35, 16}_1 ∧  b^{35, 16}_0 ∧ true) 
c  in CNF:
c     b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ false 
c  in DIMACS:
 15617 -15618 -15619  0
c  -3 does not represent an automaton state.
c    -( b^{35, 16}_2 ∧  b^{35, 16}_1 ∧  b^{35, 16}_0 ∧ true) 
c  in CNF:
c    -b^{35, 16}_2 ∨ -b^{35, 16}_1 ∨ -b^{35, 16}_0 ∨ false 
c  in DIMACS:
-15617 -15618 -15619  0

c i = 17
c  -2+1 --> -1
c    ( b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧  p_595) -> ( b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0)
c  in CNF:
c    -b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨  b^{35, 18}_2
c    -b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_1
c    -b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨  b^{35, 18}_0
c  in DIMACS:
-15620 -15621  15622 -595  15623 0
-15620 -15621  15622 -595 -15624 0
-15620 -15621  15622 -595  15625 0

c  -1+1 --> 0
c    ( b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0 ∧  p_595) -> (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧ -b^{35, 18}_0)
c  in CNF:
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_2
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_1
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_0
c  in DIMACS:
-15620  15621 -15622 -595 -15623 0
-15620  15621 -15622 -595 -15624 0
-15620  15621 -15622 -595 -15625 0

c  0+1 --> 1
c    (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧  p_595) -> (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0)
c  in CNF:
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_2
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_1
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨  b^{35, 18}_0
c  in DIMACS:
 15620  15621  15622 -595 -15623 0
 15620  15621  15622 -595 -15624 0
 15620  15621  15622 -595  15625 0

c  1+1 --> 2
c    (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0 ∧  p_595) -> (-b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0)
c  in CNF:
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_2
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨  b^{35, 18}_1
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ -p_595 ∨ -b^{35, 18}_0
c  in DIMACS:
 15620  15621 -15622 -595 -15623 0
 15620  15621 -15622 -595  15624 0
 15620  15621 -15622 -595 -15625 0

c  2+1 --> break 
c    (-b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧  p_595) -> break
c  in CNF:
c     b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 15620 -15621  15622 -595 1162 0


c  2-1 --> 1
c    (-b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧ -p_595) -> (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0)
c  in CNF:
c     b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_2
c     b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_1
c     b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨  b^{35, 18}_0
c  in DIMACS:
 15620 -15621  15622  595 -15623 0
 15620 -15621  15622  595 -15624 0
 15620 -15621  15622  595  15625 0

c  1-1 --> 0
c    (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0 ∧ -p_595) -> (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧ -b^{35, 18}_0)
c  in CNF:
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_2
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_1
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_0
c  in DIMACS:
 15620  15621 -15622  595 -15623 0
 15620  15621 -15622  595 -15624 0
 15620  15621 -15622  595 -15625 0

c  0-1 --> -1
c    (-b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧ -p_595) -> ( b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0)
c  in CNF:
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨  b^{35, 18}_2
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_1
c     b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨  b^{35, 18}_0
c  in DIMACS:
 15620  15621  15622  595  15623 0
 15620  15621  15622  595 -15624 0
 15620  15621  15622  595  15625 0

c  -1-1 --> -2
c    ( b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧  b^{35, 17}_0 ∧ -p_595) -> ( b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0)
c  in CNF:
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨  b^{35, 18}_2
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨  b^{35, 18}_1
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨  p_595 ∨ -b^{35, 18}_0
c  in DIMACS:
-15620  15621 -15622  595  15623 0
-15620  15621 -15622  595  15624 0
-15620  15621 -15622  595 -15625 0

c  -2-1 --> break 
c    ( b^{35, 17}_2 ∧  b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨  b^{35, 17}_0 ∨  p_595 ∨ break
c  in DIMACS:
-15620 -15621  15622  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 17}_2 ∧ -b^{35, 17}_1 ∧ -b^{35, 17}_0 ∧ true) 
c  in CNF:
c    -b^{35, 17}_2 ∨  b^{35, 17}_1 ∨  b^{35, 17}_0 ∨ false 
c  in DIMACS:
-15620  15621  15622  0

c  3 does not represent an automaton state.
c    -(-b^{35, 17}_2 ∧  b^{35, 17}_1 ∧  b^{35, 17}_0 ∧ true) 
c  in CNF:
c     b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ false 
c  in DIMACS:
 15620 -15621 -15622  0
c  -3 does not represent an automaton state.
c    -( b^{35, 17}_2 ∧  b^{35, 17}_1 ∧  b^{35, 17}_0 ∧ true) 
c  in CNF:
c    -b^{35, 17}_2 ∨ -b^{35, 17}_1 ∨ -b^{35, 17}_0 ∨ false 
c  in DIMACS:
-15620 -15621 -15622  0

c i = 18
c  -2+1 --> -1
c    ( b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧  p_630) -> ( b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0)
c  in CNF:
c    -b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨  b^{35, 19}_2
c    -b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_1
c    -b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨  b^{35, 19}_0
c  in DIMACS:
-15623 -15624  15625 -630  15626 0
-15623 -15624  15625 -630 -15627 0
-15623 -15624  15625 -630  15628 0

c  -1+1 --> 0
c    ( b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0 ∧  p_630) -> (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧ -b^{35, 19}_0)
c  in CNF:
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_2
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_1
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_0
c  in DIMACS:
-15623  15624 -15625 -630 -15626 0
-15623  15624 -15625 -630 -15627 0
-15623  15624 -15625 -630 -15628 0

c  0+1 --> 1
c    (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧  p_630) -> (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0)
c  in CNF:
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_2
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_1
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨  b^{35, 19}_0
c  in DIMACS:
 15623  15624  15625 -630 -15626 0
 15623  15624  15625 -630 -15627 0
 15623  15624  15625 -630  15628 0

c  1+1 --> 2
c    (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0 ∧  p_630) -> (-b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0)
c  in CNF:
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_2
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨  b^{35, 19}_1
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ -p_630 ∨ -b^{35, 19}_0
c  in DIMACS:
 15623  15624 -15625 -630 -15626 0
 15623  15624 -15625 -630  15627 0
 15623  15624 -15625 -630 -15628 0

c  2+1 --> break 
c    (-b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧  p_630) -> break
c  in CNF:
c     b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 15623 -15624  15625 -630 1162 0


c  2-1 --> 1
c    (-b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧ -p_630) -> (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0)
c  in CNF:
c     b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_2
c     b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_1
c     b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨  b^{35, 19}_0
c  in DIMACS:
 15623 -15624  15625  630 -15626 0
 15623 -15624  15625  630 -15627 0
 15623 -15624  15625  630  15628 0

c  1-1 --> 0
c    (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0 ∧ -p_630) -> (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧ -b^{35, 19}_0)
c  in CNF:
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_2
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_1
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_0
c  in DIMACS:
 15623  15624 -15625  630 -15626 0
 15623  15624 -15625  630 -15627 0
 15623  15624 -15625  630 -15628 0

c  0-1 --> -1
c    (-b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧ -p_630) -> ( b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0)
c  in CNF:
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨  b^{35, 19}_2
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_1
c     b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨  b^{35, 19}_0
c  in DIMACS:
 15623  15624  15625  630  15626 0
 15623  15624  15625  630 -15627 0
 15623  15624  15625  630  15628 0

c  -1-1 --> -2
c    ( b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧  b^{35, 18}_0 ∧ -p_630) -> ( b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0)
c  in CNF:
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨  b^{35, 19}_2
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨  b^{35, 19}_1
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨  p_630 ∨ -b^{35, 19}_0
c  in DIMACS:
-15623  15624 -15625  630  15626 0
-15623  15624 -15625  630  15627 0
-15623  15624 -15625  630 -15628 0

c  -2-1 --> break 
c    ( b^{35, 18}_2 ∧  b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨  b^{35, 18}_0 ∨  p_630 ∨ break
c  in DIMACS:
-15623 -15624  15625  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 18}_2 ∧ -b^{35, 18}_1 ∧ -b^{35, 18}_0 ∧ true) 
c  in CNF:
c    -b^{35, 18}_2 ∨  b^{35, 18}_1 ∨  b^{35, 18}_0 ∨ false 
c  in DIMACS:
-15623  15624  15625  0

c  3 does not represent an automaton state.
c    -(-b^{35, 18}_2 ∧  b^{35, 18}_1 ∧  b^{35, 18}_0 ∧ true) 
c  in CNF:
c     b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ false 
c  in DIMACS:
 15623 -15624 -15625  0
c  -3 does not represent an automaton state.
c    -( b^{35, 18}_2 ∧  b^{35, 18}_1 ∧  b^{35, 18}_0 ∧ true) 
c  in CNF:
c    -b^{35, 18}_2 ∨ -b^{35, 18}_1 ∨ -b^{35, 18}_0 ∨ false 
c  in DIMACS:
-15623 -15624 -15625  0

c i = 19
c  -2+1 --> -1
c    ( b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧  p_665) -> ( b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0)
c  in CNF:
c    -b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨  b^{35, 20}_2
c    -b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_1
c    -b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨  b^{35, 20}_0
c  in DIMACS:
-15626 -15627  15628 -665  15629 0
-15626 -15627  15628 -665 -15630 0
-15626 -15627  15628 -665  15631 0

c  -1+1 --> 0
c    ( b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0 ∧  p_665) -> (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧ -b^{35, 20}_0)
c  in CNF:
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_2
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_1
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_0
c  in DIMACS:
-15626  15627 -15628 -665 -15629 0
-15626  15627 -15628 -665 -15630 0
-15626  15627 -15628 -665 -15631 0

c  0+1 --> 1
c    (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧  p_665) -> (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0)
c  in CNF:
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_2
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_1
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨  b^{35, 20}_0
c  in DIMACS:
 15626  15627  15628 -665 -15629 0
 15626  15627  15628 -665 -15630 0
 15626  15627  15628 -665  15631 0

c  1+1 --> 2
c    (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0 ∧  p_665) -> (-b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0)
c  in CNF:
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_2
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨  b^{35, 20}_1
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ -p_665 ∨ -b^{35, 20}_0
c  in DIMACS:
 15626  15627 -15628 -665 -15629 0
 15626  15627 -15628 -665  15630 0
 15626  15627 -15628 -665 -15631 0

c  2+1 --> break 
c    (-b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧  p_665) -> break
c  in CNF:
c     b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 15626 -15627  15628 -665 1162 0


c  2-1 --> 1
c    (-b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧ -p_665) -> (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0)
c  in CNF:
c     b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_2
c     b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_1
c     b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨  b^{35, 20}_0
c  in DIMACS:
 15626 -15627  15628  665 -15629 0
 15626 -15627  15628  665 -15630 0
 15626 -15627  15628  665  15631 0

c  1-1 --> 0
c    (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0 ∧ -p_665) -> (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧ -b^{35, 20}_0)
c  in CNF:
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_2
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_1
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_0
c  in DIMACS:
 15626  15627 -15628  665 -15629 0
 15626  15627 -15628  665 -15630 0
 15626  15627 -15628  665 -15631 0

c  0-1 --> -1
c    (-b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧ -p_665) -> ( b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0)
c  in CNF:
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨  b^{35, 20}_2
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_1
c     b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨  b^{35, 20}_0
c  in DIMACS:
 15626  15627  15628  665  15629 0
 15626  15627  15628  665 -15630 0
 15626  15627  15628  665  15631 0

c  -1-1 --> -2
c    ( b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧  b^{35, 19}_0 ∧ -p_665) -> ( b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0)
c  in CNF:
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨  b^{35, 20}_2
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨  b^{35, 20}_1
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨  p_665 ∨ -b^{35, 20}_0
c  in DIMACS:
-15626  15627 -15628  665  15629 0
-15626  15627 -15628  665  15630 0
-15626  15627 -15628  665 -15631 0

c  -2-1 --> break 
c    ( b^{35, 19}_2 ∧  b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨  b^{35, 19}_0 ∨  p_665 ∨ break
c  in DIMACS:
-15626 -15627  15628  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 19}_2 ∧ -b^{35, 19}_1 ∧ -b^{35, 19}_0 ∧ true) 
c  in CNF:
c    -b^{35, 19}_2 ∨  b^{35, 19}_1 ∨  b^{35, 19}_0 ∨ false 
c  in DIMACS:
-15626  15627  15628  0

c  3 does not represent an automaton state.
c    -(-b^{35, 19}_2 ∧  b^{35, 19}_1 ∧  b^{35, 19}_0 ∧ true) 
c  in CNF:
c     b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ false 
c  in DIMACS:
 15626 -15627 -15628  0
c  -3 does not represent an automaton state.
c    -( b^{35, 19}_2 ∧  b^{35, 19}_1 ∧  b^{35, 19}_0 ∧ true) 
c  in CNF:
c    -b^{35, 19}_2 ∨ -b^{35, 19}_1 ∨ -b^{35, 19}_0 ∨ false 
c  in DIMACS:
-15626 -15627 -15628  0

c i = 20
c  -2+1 --> -1
c    ( b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧  p_700) -> ( b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0)
c  in CNF:
c    -b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨  b^{35, 21}_2
c    -b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_1
c    -b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨  b^{35, 21}_0
c  in DIMACS:
-15629 -15630  15631 -700  15632 0
-15629 -15630  15631 -700 -15633 0
-15629 -15630  15631 -700  15634 0

c  -1+1 --> 0
c    ( b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0 ∧  p_700) -> (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧ -b^{35, 21}_0)
c  in CNF:
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_2
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_1
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_0
c  in DIMACS:
-15629  15630 -15631 -700 -15632 0
-15629  15630 -15631 -700 -15633 0
-15629  15630 -15631 -700 -15634 0

c  0+1 --> 1
c    (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧  p_700) -> (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0)
c  in CNF:
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_2
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_1
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨  b^{35, 21}_0
c  in DIMACS:
 15629  15630  15631 -700 -15632 0
 15629  15630  15631 -700 -15633 0
 15629  15630  15631 -700  15634 0

c  1+1 --> 2
c    (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0 ∧  p_700) -> (-b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0)
c  in CNF:
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_2
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨  b^{35, 21}_1
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ -p_700 ∨ -b^{35, 21}_0
c  in DIMACS:
 15629  15630 -15631 -700 -15632 0
 15629  15630 -15631 -700  15633 0
 15629  15630 -15631 -700 -15634 0

c  2+1 --> break 
c    (-b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧  p_700) -> break
c  in CNF:
c     b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 15629 -15630  15631 -700 1162 0


c  2-1 --> 1
c    (-b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧ -p_700) -> (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0)
c  in CNF:
c     b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_2
c     b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_1
c     b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨  b^{35, 21}_0
c  in DIMACS:
 15629 -15630  15631  700 -15632 0
 15629 -15630  15631  700 -15633 0
 15629 -15630  15631  700  15634 0

c  1-1 --> 0
c    (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0 ∧ -p_700) -> (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧ -b^{35, 21}_0)
c  in CNF:
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_2
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_1
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_0
c  in DIMACS:
 15629  15630 -15631  700 -15632 0
 15629  15630 -15631  700 -15633 0
 15629  15630 -15631  700 -15634 0

c  0-1 --> -1
c    (-b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧ -p_700) -> ( b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0)
c  in CNF:
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨  b^{35, 21}_2
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_1
c     b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨  b^{35, 21}_0
c  in DIMACS:
 15629  15630  15631  700  15632 0
 15629  15630  15631  700 -15633 0
 15629  15630  15631  700  15634 0

c  -1-1 --> -2
c    ( b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧  b^{35, 20}_0 ∧ -p_700) -> ( b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0)
c  in CNF:
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨  b^{35, 21}_2
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨  b^{35, 21}_1
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨  p_700 ∨ -b^{35, 21}_0
c  in DIMACS:
-15629  15630 -15631  700  15632 0
-15629  15630 -15631  700  15633 0
-15629  15630 -15631  700 -15634 0

c  -2-1 --> break 
c    ( b^{35, 20}_2 ∧  b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨  b^{35, 20}_0 ∨  p_700 ∨ break
c  in DIMACS:
-15629 -15630  15631  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 20}_2 ∧ -b^{35, 20}_1 ∧ -b^{35, 20}_0 ∧ true) 
c  in CNF:
c    -b^{35, 20}_2 ∨  b^{35, 20}_1 ∨  b^{35, 20}_0 ∨ false 
c  in DIMACS:
-15629  15630  15631  0

c  3 does not represent an automaton state.
c    -(-b^{35, 20}_2 ∧  b^{35, 20}_1 ∧  b^{35, 20}_0 ∧ true) 
c  in CNF:
c     b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ false 
c  in DIMACS:
 15629 -15630 -15631  0
c  -3 does not represent an automaton state.
c    -( b^{35, 20}_2 ∧  b^{35, 20}_1 ∧  b^{35, 20}_0 ∧ true) 
c  in CNF:
c    -b^{35, 20}_2 ∨ -b^{35, 20}_1 ∨ -b^{35, 20}_0 ∨ false 
c  in DIMACS:
-15629 -15630 -15631  0

c i = 21
c  -2+1 --> -1
c    ( b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧  p_735) -> ( b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0)
c  in CNF:
c    -b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨  b^{35, 22}_2
c    -b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_1
c    -b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨  b^{35, 22}_0
c  in DIMACS:
-15632 -15633  15634 -735  15635 0
-15632 -15633  15634 -735 -15636 0
-15632 -15633  15634 -735  15637 0

c  -1+1 --> 0
c    ( b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0 ∧  p_735) -> (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧ -b^{35, 22}_0)
c  in CNF:
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_2
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_1
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_0
c  in DIMACS:
-15632  15633 -15634 -735 -15635 0
-15632  15633 -15634 -735 -15636 0
-15632  15633 -15634 -735 -15637 0

c  0+1 --> 1
c    (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧  p_735) -> (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0)
c  in CNF:
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_2
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_1
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨  b^{35, 22}_0
c  in DIMACS:
 15632  15633  15634 -735 -15635 0
 15632  15633  15634 -735 -15636 0
 15632  15633  15634 -735  15637 0

c  1+1 --> 2
c    (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0 ∧  p_735) -> (-b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0)
c  in CNF:
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_2
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨  b^{35, 22}_1
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ -p_735 ∨ -b^{35, 22}_0
c  in DIMACS:
 15632  15633 -15634 -735 -15635 0
 15632  15633 -15634 -735  15636 0
 15632  15633 -15634 -735 -15637 0

c  2+1 --> break 
c    (-b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧  p_735) -> break
c  in CNF:
c     b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 15632 -15633  15634 -735 1162 0


c  2-1 --> 1
c    (-b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧ -p_735) -> (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0)
c  in CNF:
c     b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_2
c     b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_1
c     b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨  b^{35, 22}_0
c  in DIMACS:
 15632 -15633  15634  735 -15635 0
 15632 -15633  15634  735 -15636 0
 15632 -15633  15634  735  15637 0

c  1-1 --> 0
c    (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0 ∧ -p_735) -> (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧ -b^{35, 22}_0)
c  in CNF:
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_2
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_1
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_0
c  in DIMACS:
 15632  15633 -15634  735 -15635 0
 15632  15633 -15634  735 -15636 0
 15632  15633 -15634  735 -15637 0

c  0-1 --> -1
c    (-b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧ -p_735) -> ( b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0)
c  in CNF:
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨  b^{35, 22}_2
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_1
c     b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨  b^{35, 22}_0
c  in DIMACS:
 15632  15633  15634  735  15635 0
 15632  15633  15634  735 -15636 0
 15632  15633  15634  735  15637 0

c  -1-1 --> -2
c    ( b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧  b^{35, 21}_0 ∧ -p_735) -> ( b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0)
c  in CNF:
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨  b^{35, 22}_2
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨  b^{35, 22}_1
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨  p_735 ∨ -b^{35, 22}_0
c  in DIMACS:
-15632  15633 -15634  735  15635 0
-15632  15633 -15634  735  15636 0
-15632  15633 -15634  735 -15637 0

c  -2-1 --> break 
c    ( b^{35, 21}_2 ∧  b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨  b^{35, 21}_0 ∨  p_735 ∨ break
c  in DIMACS:
-15632 -15633  15634  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 21}_2 ∧ -b^{35, 21}_1 ∧ -b^{35, 21}_0 ∧ true) 
c  in CNF:
c    -b^{35, 21}_2 ∨  b^{35, 21}_1 ∨  b^{35, 21}_0 ∨ false 
c  in DIMACS:
-15632  15633  15634  0

c  3 does not represent an automaton state.
c    -(-b^{35, 21}_2 ∧  b^{35, 21}_1 ∧  b^{35, 21}_0 ∧ true) 
c  in CNF:
c     b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ false 
c  in DIMACS:
 15632 -15633 -15634  0
c  -3 does not represent an automaton state.
c    -( b^{35, 21}_2 ∧  b^{35, 21}_1 ∧  b^{35, 21}_0 ∧ true) 
c  in CNF:
c    -b^{35, 21}_2 ∨ -b^{35, 21}_1 ∨ -b^{35, 21}_0 ∨ false 
c  in DIMACS:
-15632 -15633 -15634  0

c i = 22
c  -2+1 --> -1
c    ( b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧  p_770) -> ( b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0)
c  in CNF:
c    -b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨  b^{35, 23}_2
c    -b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_1
c    -b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨  b^{35, 23}_0
c  in DIMACS:
-15635 -15636  15637 -770  15638 0
-15635 -15636  15637 -770 -15639 0
-15635 -15636  15637 -770  15640 0

c  -1+1 --> 0
c    ( b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0 ∧  p_770) -> (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧ -b^{35, 23}_0)
c  in CNF:
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_2
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_1
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_0
c  in DIMACS:
-15635  15636 -15637 -770 -15638 0
-15635  15636 -15637 -770 -15639 0
-15635  15636 -15637 -770 -15640 0

c  0+1 --> 1
c    (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧  p_770) -> (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0)
c  in CNF:
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_2
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_1
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨  b^{35, 23}_0
c  in DIMACS:
 15635  15636  15637 -770 -15638 0
 15635  15636  15637 -770 -15639 0
 15635  15636  15637 -770  15640 0

c  1+1 --> 2
c    (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0 ∧  p_770) -> (-b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0)
c  in CNF:
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_2
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨  b^{35, 23}_1
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ -p_770 ∨ -b^{35, 23}_0
c  in DIMACS:
 15635  15636 -15637 -770 -15638 0
 15635  15636 -15637 -770  15639 0
 15635  15636 -15637 -770 -15640 0

c  2+1 --> break 
c    (-b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧  p_770) -> break
c  in CNF:
c     b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 15635 -15636  15637 -770 1162 0


c  2-1 --> 1
c    (-b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧ -p_770) -> (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0)
c  in CNF:
c     b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_2
c     b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_1
c     b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨  b^{35, 23}_0
c  in DIMACS:
 15635 -15636  15637  770 -15638 0
 15635 -15636  15637  770 -15639 0
 15635 -15636  15637  770  15640 0

c  1-1 --> 0
c    (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0 ∧ -p_770) -> (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧ -b^{35, 23}_0)
c  in CNF:
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_2
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_1
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_0
c  in DIMACS:
 15635  15636 -15637  770 -15638 0
 15635  15636 -15637  770 -15639 0
 15635  15636 -15637  770 -15640 0

c  0-1 --> -1
c    (-b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧ -p_770) -> ( b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0)
c  in CNF:
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨  b^{35, 23}_2
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_1
c     b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨  b^{35, 23}_0
c  in DIMACS:
 15635  15636  15637  770  15638 0
 15635  15636  15637  770 -15639 0
 15635  15636  15637  770  15640 0

c  -1-1 --> -2
c    ( b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧  b^{35, 22}_0 ∧ -p_770) -> ( b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0)
c  in CNF:
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨  b^{35, 23}_2
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨  b^{35, 23}_1
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨  p_770 ∨ -b^{35, 23}_0
c  in DIMACS:
-15635  15636 -15637  770  15638 0
-15635  15636 -15637  770  15639 0
-15635  15636 -15637  770 -15640 0

c  -2-1 --> break 
c    ( b^{35, 22}_2 ∧  b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨  b^{35, 22}_0 ∨  p_770 ∨ break
c  in DIMACS:
-15635 -15636  15637  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 22}_2 ∧ -b^{35, 22}_1 ∧ -b^{35, 22}_0 ∧ true) 
c  in CNF:
c    -b^{35, 22}_2 ∨  b^{35, 22}_1 ∨  b^{35, 22}_0 ∨ false 
c  in DIMACS:
-15635  15636  15637  0

c  3 does not represent an automaton state.
c    -(-b^{35, 22}_2 ∧  b^{35, 22}_1 ∧  b^{35, 22}_0 ∧ true) 
c  in CNF:
c     b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ false 
c  in DIMACS:
 15635 -15636 -15637  0
c  -3 does not represent an automaton state.
c    -( b^{35, 22}_2 ∧  b^{35, 22}_1 ∧  b^{35, 22}_0 ∧ true) 
c  in CNF:
c    -b^{35, 22}_2 ∨ -b^{35, 22}_1 ∨ -b^{35, 22}_0 ∨ false 
c  in DIMACS:
-15635 -15636 -15637  0

c i = 23
c  -2+1 --> -1
c    ( b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧  p_805) -> ( b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0)
c  in CNF:
c    -b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨  b^{35, 24}_2
c    -b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_1
c    -b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨  b^{35, 24}_0
c  in DIMACS:
-15638 -15639  15640 -805  15641 0
-15638 -15639  15640 -805 -15642 0
-15638 -15639  15640 -805  15643 0

c  -1+1 --> 0
c    ( b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0 ∧  p_805) -> (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧ -b^{35, 24}_0)
c  in CNF:
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_2
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_1
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_0
c  in DIMACS:
-15638  15639 -15640 -805 -15641 0
-15638  15639 -15640 -805 -15642 0
-15638  15639 -15640 -805 -15643 0

c  0+1 --> 1
c    (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧  p_805) -> (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0)
c  in CNF:
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_2
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_1
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨  b^{35, 24}_0
c  in DIMACS:
 15638  15639  15640 -805 -15641 0
 15638  15639  15640 -805 -15642 0
 15638  15639  15640 -805  15643 0

c  1+1 --> 2
c    (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0 ∧  p_805) -> (-b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0)
c  in CNF:
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_2
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨  b^{35, 24}_1
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ -p_805 ∨ -b^{35, 24}_0
c  in DIMACS:
 15638  15639 -15640 -805 -15641 0
 15638  15639 -15640 -805  15642 0
 15638  15639 -15640 -805 -15643 0

c  2+1 --> break 
c    (-b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧  p_805) -> break
c  in CNF:
c     b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 15638 -15639  15640 -805 1162 0


c  2-1 --> 1
c    (-b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧ -p_805) -> (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0)
c  in CNF:
c     b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_2
c     b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_1
c     b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨  b^{35, 24}_0
c  in DIMACS:
 15638 -15639  15640  805 -15641 0
 15638 -15639  15640  805 -15642 0
 15638 -15639  15640  805  15643 0

c  1-1 --> 0
c    (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0 ∧ -p_805) -> (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧ -b^{35, 24}_0)
c  in CNF:
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_2
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_1
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_0
c  in DIMACS:
 15638  15639 -15640  805 -15641 0
 15638  15639 -15640  805 -15642 0
 15638  15639 -15640  805 -15643 0

c  0-1 --> -1
c    (-b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧ -p_805) -> ( b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0)
c  in CNF:
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨  b^{35, 24}_2
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_1
c     b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨  b^{35, 24}_0
c  in DIMACS:
 15638  15639  15640  805  15641 0
 15638  15639  15640  805 -15642 0
 15638  15639  15640  805  15643 0

c  -1-1 --> -2
c    ( b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧  b^{35, 23}_0 ∧ -p_805) -> ( b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0)
c  in CNF:
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨  b^{35, 24}_2
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨  b^{35, 24}_1
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨  p_805 ∨ -b^{35, 24}_0
c  in DIMACS:
-15638  15639 -15640  805  15641 0
-15638  15639 -15640  805  15642 0
-15638  15639 -15640  805 -15643 0

c  -2-1 --> break 
c    ( b^{35, 23}_2 ∧  b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨  b^{35, 23}_0 ∨  p_805 ∨ break
c  in DIMACS:
-15638 -15639  15640  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 23}_2 ∧ -b^{35, 23}_1 ∧ -b^{35, 23}_0 ∧ true) 
c  in CNF:
c    -b^{35, 23}_2 ∨  b^{35, 23}_1 ∨  b^{35, 23}_0 ∨ false 
c  in DIMACS:
-15638  15639  15640  0

c  3 does not represent an automaton state.
c    -(-b^{35, 23}_2 ∧  b^{35, 23}_1 ∧  b^{35, 23}_0 ∧ true) 
c  in CNF:
c     b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ false 
c  in DIMACS:
 15638 -15639 -15640  0
c  -3 does not represent an automaton state.
c    -( b^{35, 23}_2 ∧  b^{35, 23}_1 ∧  b^{35, 23}_0 ∧ true) 
c  in CNF:
c    -b^{35, 23}_2 ∨ -b^{35, 23}_1 ∨ -b^{35, 23}_0 ∨ false 
c  in DIMACS:
-15638 -15639 -15640  0

c i = 24
c  -2+1 --> -1
c    ( b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧  p_840) -> ( b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0)
c  in CNF:
c    -b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨  b^{35, 25}_2
c    -b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_1
c    -b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨  b^{35, 25}_0
c  in DIMACS:
-15641 -15642  15643 -840  15644 0
-15641 -15642  15643 -840 -15645 0
-15641 -15642  15643 -840  15646 0

c  -1+1 --> 0
c    ( b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0 ∧  p_840) -> (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧ -b^{35, 25}_0)
c  in CNF:
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_2
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_1
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_0
c  in DIMACS:
-15641  15642 -15643 -840 -15644 0
-15641  15642 -15643 -840 -15645 0
-15641  15642 -15643 -840 -15646 0

c  0+1 --> 1
c    (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧  p_840) -> (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0)
c  in CNF:
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_2
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_1
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨  b^{35, 25}_0
c  in DIMACS:
 15641  15642  15643 -840 -15644 0
 15641  15642  15643 -840 -15645 0
 15641  15642  15643 -840  15646 0

c  1+1 --> 2
c    (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0 ∧  p_840) -> (-b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0)
c  in CNF:
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_2
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨  b^{35, 25}_1
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ -p_840 ∨ -b^{35, 25}_0
c  in DIMACS:
 15641  15642 -15643 -840 -15644 0
 15641  15642 -15643 -840  15645 0
 15641  15642 -15643 -840 -15646 0

c  2+1 --> break 
c    (-b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧  p_840) -> break
c  in CNF:
c     b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 15641 -15642  15643 -840 1162 0


c  2-1 --> 1
c    (-b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧ -p_840) -> (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0)
c  in CNF:
c     b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_2
c     b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_1
c     b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨  b^{35, 25}_0
c  in DIMACS:
 15641 -15642  15643  840 -15644 0
 15641 -15642  15643  840 -15645 0
 15641 -15642  15643  840  15646 0

c  1-1 --> 0
c    (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0 ∧ -p_840) -> (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧ -b^{35, 25}_0)
c  in CNF:
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_2
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_1
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_0
c  in DIMACS:
 15641  15642 -15643  840 -15644 0
 15641  15642 -15643  840 -15645 0
 15641  15642 -15643  840 -15646 0

c  0-1 --> -1
c    (-b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧ -p_840) -> ( b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0)
c  in CNF:
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨  b^{35, 25}_2
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_1
c     b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨  b^{35, 25}_0
c  in DIMACS:
 15641  15642  15643  840  15644 0
 15641  15642  15643  840 -15645 0
 15641  15642  15643  840  15646 0

c  -1-1 --> -2
c    ( b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧  b^{35, 24}_0 ∧ -p_840) -> ( b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0)
c  in CNF:
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨  b^{35, 25}_2
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨  b^{35, 25}_1
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨  p_840 ∨ -b^{35, 25}_0
c  in DIMACS:
-15641  15642 -15643  840  15644 0
-15641  15642 -15643  840  15645 0
-15641  15642 -15643  840 -15646 0

c  -2-1 --> break 
c    ( b^{35, 24}_2 ∧  b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨  b^{35, 24}_0 ∨  p_840 ∨ break
c  in DIMACS:
-15641 -15642  15643  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 24}_2 ∧ -b^{35, 24}_1 ∧ -b^{35, 24}_0 ∧ true) 
c  in CNF:
c    -b^{35, 24}_2 ∨  b^{35, 24}_1 ∨  b^{35, 24}_0 ∨ false 
c  in DIMACS:
-15641  15642  15643  0

c  3 does not represent an automaton state.
c    -(-b^{35, 24}_2 ∧  b^{35, 24}_1 ∧  b^{35, 24}_0 ∧ true) 
c  in CNF:
c     b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ false 
c  in DIMACS:
 15641 -15642 -15643  0
c  -3 does not represent an automaton state.
c    -( b^{35, 24}_2 ∧  b^{35, 24}_1 ∧  b^{35, 24}_0 ∧ true) 
c  in CNF:
c    -b^{35, 24}_2 ∨ -b^{35, 24}_1 ∨ -b^{35, 24}_0 ∨ false 
c  in DIMACS:
-15641 -15642 -15643  0

c i = 25
c  -2+1 --> -1
c    ( b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧  p_875) -> ( b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0)
c  in CNF:
c    -b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨  b^{35, 26}_2
c    -b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_1
c    -b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨  b^{35, 26}_0
c  in DIMACS:
-15644 -15645  15646 -875  15647 0
-15644 -15645  15646 -875 -15648 0
-15644 -15645  15646 -875  15649 0

c  -1+1 --> 0
c    ( b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0 ∧  p_875) -> (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧ -b^{35, 26}_0)
c  in CNF:
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_2
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_1
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_0
c  in DIMACS:
-15644  15645 -15646 -875 -15647 0
-15644  15645 -15646 -875 -15648 0
-15644  15645 -15646 -875 -15649 0

c  0+1 --> 1
c    (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧  p_875) -> (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0)
c  in CNF:
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_2
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_1
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨  b^{35, 26}_0
c  in DIMACS:
 15644  15645  15646 -875 -15647 0
 15644  15645  15646 -875 -15648 0
 15644  15645  15646 -875  15649 0

c  1+1 --> 2
c    (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0 ∧  p_875) -> (-b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0)
c  in CNF:
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_2
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨  b^{35, 26}_1
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ -p_875 ∨ -b^{35, 26}_0
c  in DIMACS:
 15644  15645 -15646 -875 -15647 0
 15644  15645 -15646 -875  15648 0
 15644  15645 -15646 -875 -15649 0

c  2+1 --> break 
c    (-b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧  p_875) -> break
c  in CNF:
c     b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 15644 -15645  15646 -875 1162 0


c  2-1 --> 1
c    (-b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧ -p_875) -> (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0)
c  in CNF:
c     b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_2
c     b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_1
c     b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨  b^{35, 26}_0
c  in DIMACS:
 15644 -15645  15646  875 -15647 0
 15644 -15645  15646  875 -15648 0
 15644 -15645  15646  875  15649 0

c  1-1 --> 0
c    (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0 ∧ -p_875) -> (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧ -b^{35, 26}_0)
c  in CNF:
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_2
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_1
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_0
c  in DIMACS:
 15644  15645 -15646  875 -15647 0
 15644  15645 -15646  875 -15648 0
 15644  15645 -15646  875 -15649 0

c  0-1 --> -1
c    (-b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧ -p_875) -> ( b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0)
c  in CNF:
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨  b^{35, 26}_2
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_1
c     b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨  b^{35, 26}_0
c  in DIMACS:
 15644  15645  15646  875  15647 0
 15644  15645  15646  875 -15648 0
 15644  15645  15646  875  15649 0

c  -1-1 --> -2
c    ( b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧  b^{35, 25}_0 ∧ -p_875) -> ( b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0)
c  in CNF:
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨  b^{35, 26}_2
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨  b^{35, 26}_1
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨  p_875 ∨ -b^{35, 26}_0
c  in DIMACS:
-15644  15645 -15646  875  15647 0
-15644  15645 -15646  875  15648 0
-15644  15645 -15646  875 -15649 0

c  -2-1 --> break 
c    ( b^{35, 25}_2 ∧  b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨  b^{35, 25}_0 ∨  p_875 ∨ break
c  in DIMACS:
-15644 -15645  15646  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 25}_2 ∧ -b^{35, 25}_1 ∧ -b^{35, 25}_0 ∧ true) 
c  in CNF:
c    -b^{35, 25}_2 ∨  b^{35, 25}_1 ∨  b^{35, 25}_0 ∨ false 
c  in DIMACS:
-15644  15645  15646  0

c  3 does not represent an automaton state.
c    -(-b^{35, 25}_2 ∧  b^{35, 25}_1 ∧  b^{35, 25}_0 ∧ true) 
c  in CNF:
c     b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ false 
c  in DIMACS:
 15644 -15645 -15646  0
c  -3 does not represent an automaton state.
c    -( b^{35, 25}_2 ∧  b^{35, 25}_1 ∧  b^{35, 25}_0 ∧ true) 
c  in CNF:
c    -b^{35, 25}_2 ∨ -b^{35, 25}_1 ∨ -b^{35, 25}_0 ∨ false 
c  in DIMACS:
-15644 -15645 -15646  0

c i = 26
c  -2+1 --> -1
c    ( b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧  p_910) -> ( b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0)
c  in CNF:
c    -b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨  b^{35, 27}_2
c    -b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_1
c    -b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨  b^{35, 27}_0
c  in DIMACS:
-15647 -15648  15649 -910  15650 0
-15647 -15648  15649 -910 -15651 0
-15647 -15648  15649 -910  15652 0

c  -1+1 --> 0
c    ( b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0 ∧  p_910) -> (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧ -b^{35, 27}_0)
c  in CNF:
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_2
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_1
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_0
c  in DIMACS:
-15647  15648 -15649 -910 -15650 0
-15647  15648 -15649 -910 -15651 0
-15647  15648 -15649 -910 -15652 0

c  0+1 --> 1
c    (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧  p_910) -> (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0)
c  in CNF:
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_2
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_1
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨  b^{35, 27}_0
c  in DIMACS:
 15647  15648  15649 -910 -15650 0
 15647  15648  15649 -910 -15651 0
 15647  15648  15649 -910  15652 0

c  1+1 --> 2
c    (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0 ∧  p_910) -> (-b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0)
c  in CNF:
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_2
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨  b^{35, 27}_1
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ -p_910 ∨ -b^{35, 27}_0
c  in DIMACS:
 15647  15648 -15649 -910 -15650 0
 15647  15648 -15649 -910  15651 0
 15647  15648 -15649 -910 -15652 0

c  2+1 --> break 
c    (-b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧  p_910) -> break
c  in CNF:
c     b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 15647 -15648  15649 -910 1162 0


c  2-1 --> 1
c    (-b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧ -p_910) -> (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0)
c  in CNF:
c     b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_2
c     b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_1
c     b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨  b^{35, 27}_0
c  in DIMACS:
 15647 -15648  15649  910 -15650 0
 15647 -15648  15649  910 -15651 0
 15647 -15648  15649  910  15652 0

c  1-1 --> 0
c    (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0 ∧ -p_910) -> (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧ -b^{35, 27}_0)
c  in CNF:
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_2
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_1
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_0
c  in DIMACS:
 15647  15648 -15649  910 -15650 0
 15647  15648 -15649  910 -15651 0
 15647  15648 -15649  910 -15652 0

c  0-1 --> -1
c    (-b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧ -p_910) -> ( b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0)
c  in CNF:
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨  b^{35, 27}_2
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_1
c     b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨  b^{35, 27}_0
c  in DIMACS:
 15647  15648  15649  910  15650 0
 15647  15648  15649  910 -15651 0
 15647  15648  15649  910  15652 0

c  -1-1 --> -2
c    ( b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧  b^{35, 26}_0 ∧ -p_910) -> ( b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0)
c  in CNF:
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨  b^{35, 27}_2
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨  b^{35, 27}_1
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨  p_910 ∨ -b^{35, 27}_0
c  in DIMACS:
-15647  15648 -15649  910  15650 0
-15647  15648 -15649  910  15651 0
-15647  15648 -15649  910 -15652 0

c  -2-1 --> break 
c    ( b^{35, 26}_2 ∧  b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨  b^{35, 26}_0 ∨  p_910 ∨ break
c  in DIMACS:
-15647 -15648  15649  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 26}_2 ∧ -b^{35, 26}_1 ∧ -b^{35, 26}_0 ∧ true) 
c  in CNF:
c    -b^{35, 26}_2 ∨  b^{35, 26}_1 ∨  b^{35, 26}_0 ∨ false 
c  in DIMACS:
-15647  15648  15649  0

c  3 does not represent an automaton state.
c    -(-b^{35, 26}_2 ∧  b^{35, 26}_1 ∧  b^{35, 26}_0 ∧ true) 
c  in CNF:
c     b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ false 
c  in DIMACS:
 15647 -15648 -15649  0
c  -3 does not represent an automaton state.
c    -( b^{35, 26}_2 ∧  b^{35, 26}_1 ∧  b^{35, 26}_0 ∧ true) 
c  in CNF:
c    -b^{35, 26}_2 ∨ -b^{35, 26}_1 ∨ -b^{35, 26}_0 ∨ false 
c  in DIMACS:
-15647 -15648 -15649  0

c i = 27
c  -2+1 --> -1
c    ( b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧  p_945) -> ( b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0)
c  in CNF:
c    -b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨  b^{35, 28}_2
c    -b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_1
c    -b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨  b^{35, 28}_0
c  in DIMACS:
-15650 -15651  15652 -945  15653 0
-15650 -15651  15652 -945 -15654 0
-15650 -15651  15652 -945  15655 0

c  -1+1 --> 0
c    ( b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0 ∧  p_945) -> (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧ -b^{35, 28}_0)
c  in CNF:
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_2
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_1
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_0
c  in DIMACS:
-15650  15651 -15652 -945 -15653 0
-15650  15651 -15652 -945 -15654 0
-15650  15651 -15652 -945 -15655 0

c  0+1 --> 1
c    (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧  p_945) -> (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0)
c  in CNF:
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_2
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_1
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨  b^{35, 28}_0
c  in DIMACS:
 15650  15651  15652 -945 -15653 0
 15650  15651  15652 -945 -15654 0
 15650  15651  15652 -945  15655 0

c  1+1 --> 2
c    (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0 ∧  p_945) -> (-b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0)
c  in CNF:
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_2
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨  b^{35, 28}_1
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ -p_945 ∨ -b^{35, 28}_0
c  in DIMACS:
 15650  15651 -15652 -945 -15653 0
 15650  15651 -15652 -945  15654 0
 15650  15651 -15652 -945 -15655 0

c  2+1 --> break 
c    (-b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧  p_945) -> break
c  in CNF:
c     b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 15650 -15651  15652 -945 1162 0


c  2-1 --> 1
c    (-b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧ -p_945) -> (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0)
c  in CNF:
c     b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_2
c     b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_1
c     b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨  b^{35, 28}_0
c  in DIMACS:
 15650 -15651  15652  945 -15653 0
 15650 -15651  15652  945 -15654 0
 15650 -15651  15652  945  15655 0

c  1-1 --> 0
c    (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0 ∧ -p_945) -> (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧ -b^{35, 28}_0)
c  in CNF:
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_2
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_1
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_0
c  in DIMACS:
 15650  15651 -15652  945 -15653 0
 15650  15651 -15652  945 -15654 0
 15650  15651 -15652  945 -15655 0

c  0-1 --> -1
c    (-b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧ -p_945) -> ( b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0)
c  in CNF:
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨  b^{35, 28}_2
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_1
c     b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨  b^{35, 28}_0
c  in DIMACS:
 15650  15651  15652  945  15653 0
 15650  15651  15652  945 -15654 0
 15650  15651  15652  945  15655 0

c  -1-1 --> -2
c    ( b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧  b^{35, 27}_0 ∧ -p_945) -> ( b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0)
c  in CNF:
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨  b^{35, 28}_2
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨  b^{35, 28}_1
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨  p_945 ∨ -b^{35, 28}_0
c  in DIMACS:
-15650  15651 -15652  945  15653 0
-15650  15651 -15652  945  15654 0
-15650  15651 -15652  945 -15655 0

c  -2-1 --> break 
c    ( b^{35, 27}_2 ∧  b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨  b^{35, 27}_0 ∨  p_945 ∨ break
c  in DIMACS:
-15650 -15651  15652  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 27}_2 ∧ -b^{35, 27}_1 ∧ -b^{35, 27}_0 ∧ true) 
c  in CNF:
c    -b^{35, 27}_2 ∨  b^{35, 27}_1 ∨  b^{35, 27}_0 ∨ false 
c  in DIMACS:
-15650  15651  15652  0

c  3 does not represent an automaton state.
c    -(-b^{35, 27}_2 ∧  b^{35, 27}_1 ∧  b^{35, 27}_0 ∧ true) 
c  in CNF:
c     b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ false 
c  in DIMACS:
 15650 -15651 -15652  0
c  -3 does not represent an automaton state.
c    -( b^{35, 27}_2 ∧  b^{35, 27}_1 ∧  b^{35, 27}_0 ∧ true) 
c  in CNF:
c    -b^{35, 27}_2 ∨ -b^{35, 27}_1 ∨ -b^{35, 27}_0 ∨ false 
c  in DIMACS:
-15650 -15651 -15652  0

c i = 28
c  -2+1 --> -1
c    ( b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧  p_980) -> ( b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0)
c  in CNF:
c    -b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨  b^{35, 29}_2
c    -b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_1
c    -b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨  b^{35, 29}_0
c  in DIMACS:
-15653 -15654  15655 -980  15656 0
-15653 -15654  15655 -980 -15657 0
-15653 -15654  15655 -980  15658 0

c  -1+1 --> 0
c    ( b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0 ∧  p_980) -> (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧ -b^{35, 29}_0)
c  in CNF:
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_2
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_1
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_0
c  in DIMACS:
-15653  15654 -15655 -980 -15656 0
-15653  15654 -15655 -980 -15657 0
-15653  15654 -15655 -980 -15658 0

c  0+1 --> 1
c    (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧  p_980) -> (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0)
c  in CNF:
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_2
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_1
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨  b^{35, 29}_0
c  in DIMACS:
 15653  15654  15655 -980 -15656 0
 15653  15654  15655 -980 -15657 0
 15653  15654  15655 -980  15658 0

c  1+1 --> 2
c    (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0 ∧  p_980) -> (-b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0)
c  in CNF:
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_2
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨  b^{35, 29}_1
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ -p_980 ∨ -b^{35, 29}_0
c  in DIMACS:
 15653  15654 -15655 -980 -15656 0
 15653  15654 -15655 -980  15657 0
 15653  15654 -15655 -980 -15658 0

c  2+1 --> break 
c    (-b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧  p_980) -> break
c  in CNF:
c     b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 15653 -15654  15655 -980 1162 0


c  2-1 --> 1
c    (-b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧ -p_980) -> (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0)
c  in CNF:
c     b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_2
c     b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_1
c     b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨  b^{35, 29}_0
c  in DIMACS:
 15653 -15654  15655  980 -15656 0
 15653 -15654  15655  980 -15657 0
 15653 -15654  15655  980  15658 0

c  1-1 --> 0
c    (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0 ∧ -p_980) -> (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧ -b^{35, 29}_0)
c  in CNF:
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_2
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_1
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_0
c  in DIMACS:
 15653  15654 -15655  980 -15656 0
 15653  15654 -15655  980 -15657 0
 15653  15654 -15655  980 -15658 0

c  0-1 --> -1
c    (-b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧ -p_980) -> ( b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0)
c  in CNF:
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨  b^{35, 29}_2
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_1
c     b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨  b^{35, 29}_0
c  in DIMACS:
 15653  15654  15655  980  15656 0
 15653  15654  15655  980 -15657 0
 15653  15654  15655  980  15658 0

c  -1-1 --> -2
c    ( b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧  b^{35, 28}_0 ∧ -p_980) -> ( b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0)
c  in CNF:
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨  b^{35, 29}_2
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨  b^{35, 29}_1
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨  p_980 ∨ -b^{35, 29}_0
c  in DIMACS:
-15653  15654 -15655  980  15656 0
-15653  15654 -15655  980  15657 0
-15653  15654 -15655  980 -15658 0

c  -2-1 --> break 
c    ( b^{35, 28}_2 ∧  b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨  b^{35, 28}_0 ∨  p_980 ∨ break
c  in DIMACS:
-15653 -15654  15655  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 28}_2 ∧ -b^{35, 28}_1 ∧ -b^{35, 28}_0 ∧ true) 
c  in CNF:
c    -b^{35, 28}_2 ∨  b^{35, 28}_1 ∨  b^{35, 28}_0 ∨ false 
c  in DIMACS:
-15653  15654  15655  0

c  3 does not represent an automaton state.
c    -(-b^{35, 28}_2 ∧  b^{35, 28}_1 ∧  b^{35, 28}_0 ∧ true) 
c  in CNF:
c     b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ false 
c  in DIMACS:
 15653 -15654 -15655  0
c  -3 does not represent an automaton state.
c    -( b^{35, 28}_2 ∧  b^{35, 28}_1 ∧  b^{35, 28}_0 ∧ true) 
c  in CNF:
c    -b^{35, 28}_2 ∨ -b^{35, 28}_1 ∨ -b^{35, 28}_0 ∨ false 
c  in DIMACS:
-15653 -15654 -15655  0

c i = 29
c  -2+1 --> -1
c    ( b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧  p_1015) -> ( b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0)
c  in CNF:
c    -b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨  b^{35, 30}_2
c    -b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_1
c    -b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨  b^{35, 30}_0
c  in DIMACS:
-15656 -15657  15658 -1015  15659 0
-15656 -15657  15658 -1015 -15660 0
-15656 -15657  15658 -1015  15661 0

c  -1+1 --> 0
c    ( b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0 ∧  p_1015) -> (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧ -b^{35, 30}_0)
c  in CNF:
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_2
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_1
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_0
c  in DIMACS:
-15656  15657 -15658 -1015 -15659 0
-15656  15657 -15658 -1015 -15660 0
-15656  15657 -15658 -1015 -15661 0

c  0+1 --> 1
c    (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧  p_1015) -> (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0)
c  in CNF:
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_2
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_1
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨  b^{35, 30}_0
c  in DIMACS:
 15656  15657  15658 -1015 -15659 0
 15656  15657  15658 -1015 -15660 0
 15656  15657  15658 -1015  15661 0

c  1+1 --> 2
c    (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0 ∧  p_1015) -> (-b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0)
c  in CNF:
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_2
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨  b^{35, 30}_1
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ -p_1015 ∨ -b^{35, 30}_0
c  in DIMACS:
 15656  15657 -15658 -1015 -15659 0
 15656  15657 -15658 -1015  15660 0
 15656  15657 -15658 -1015 -15661 0

c  2+1 --> break 
c    (-b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 15656 -15657  15658 -1015 1162 0


c  2-1 --> 1
c    (-b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧ -p_1015) -> (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0)
c  in CNF:
c     b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_2
c     b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_1
c     b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨  b^{35, 30}_0
c  in DIMACS:
 15656 -15657  15658  1015 -15659 0
 15656 -15657  15658  1015 -15660 0
 15656 -15657  15658  1015  15661 0

c  1-1 --> 0
c    (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0 ∧ -p_1015) -> (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧ -b^{35, 30}_0)
c  in CNF:
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_2
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_1
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_0
c  in DIMACS:
 15656  15657 -15658  1015 -15659 0
 15656  15657 -15658  1015 -15660 0
 15656  15657 -15658  1015 -15661 0

c  0-1 --> -1
c    (-b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧ -p_1015) -> ( b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0)
c  in CNF:
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨  b^{35, 30}_2
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_1
c     b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨  b^{35, 30}_0
c  in DIMACS:
 15656  15657  15658  1015  15659 0
 15656  15657  15658  1015 -15660 0
 15656  15657  15658  1015  15661 0

c  -1-1 --> -2
c    ( b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧  b^{35, 29}_0 ∧ -p_1015) -> ( b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0)
c  in CNF:
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨  b^{35, 30}_2
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨  b^{35, 30}_1
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨  p_1015 ∨ -b^{35, 30}_0
c  in DIMACS:
-15656  15657 -15658  1015  15659 0
-15656  15657 -15658  1015  15660 0
-15656  15657 -15658  1015 -15661 0

c  -2-1 --> break 
c    ( b^{35, 29}_2 ∧  b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨  b^{35, 29}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-15656 -15657  15658  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 29}_2 ∧ -b^{35, 29}_1 ∧ -b^{35, 29}_0 ∧ true) 
c  in CNF:
c    -b^{35, 29}_2 ∨  b^{35, 29}_1 ∨  b^{35, 29}_0 ∨ false 
c  in DIMACS:
-15656  15657  15658  0

c  3 does not represent an automaton state.
c    -(-b^{35, 29}_2 ∧  b^{35, 29}_1 ∧  b^{35, 29}_0 ∧ true) 
c  in CNF:
c     b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ false 
c  in DIMACS:
 15656 -15657 -15658  0
c  -3 does not represent an automaton state.
c    -( b^{35, 29}_2 ∧  b^{35, 29}_1 ∧  b^{35, 29}_0 ∧ true) 
c  in CNF:
c    -b^{35, 29}_2 ∨ -b^{35, 29}_1 ∨ -b^{35, 29}_0 ∨ false 
c  in DIMACS:
-15656 -15657 -15658  0

c i = 30
c  -2+1 --> -1
c    ( b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧  p_1050) -> ( b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0)
c  in CNF:
c    -b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨  b^{35, 31}_2
c    -b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_1
c    -b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨  b^{35, 31}_0
c  in DIMACS:
-15659 -15660  15661 -1050  15662 0
-15659 -15660  15661 -1050 -15663 0
-15659 -15660  15661 -1050  15664 0

c  -1+1 --> 0
c    ( b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0 ∧  p_1050) -> (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧ -b^{35, 31}_0)
c  in CNF:
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_2
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_1
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_0
c  in DIMACS:
-15659  15660 -15661 -1050 -15662 0
-15659  15660 -15661 -1050 -15663 0
-15659  15660 -15661 -1050 -15664 0

c  0+1 --> 1
c    (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧  p_1050) -> (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0)
c  in CNF:
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_2
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_1
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨  b^{35, 31}_0
c  in DIMACS:
 15659  15660  15661 -1050 -15662 0
 15659  15660  15661 -1050 -15663 0
 15659  15660  15661 -1050  15664 0

c  1+1 --> 2
c    (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0 ∧  p_1050) -> (-b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0)
c  in CNF:
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_2
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨  b^{35, 31}_1
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ -p_1050 ∨ -b^{35, 31}_0
c  in DIMACS:
 15659  15660 -15661 -1050 -15662 0
 15659  15660 -15661 -1050  15663 0
 15659  15660 -15661 -1050 -15664 0

c  2+1 --> break 
c    (-b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 15659 -15660  15661 -1050 1162 0


c  2-1 --> 1
c    (-b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧ -p_1050) -> (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0)
c  in CNF:
c     b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_2
c     b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_1
c     b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨  b^{35, 31}_0
c  in DIMACS:
 15659 -15660  15661  1050 -15662 0
 15659 -15660  15661  1050 -15663 0
 15659 -15660  15661  1050  15664 0

c  1-1 --> 0
c    (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0 ∧ -p_1050) -> (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧ -b^{35, 31}_0)
c  in CNF:
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_2
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_1
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_0
c  in DIMACS:
 15659  15660 -15661  1050 -15662 0
 15659  15660 -15661  1050 -15663 0
 15659  15660 -15661  1050 -15664 0

c  0-1 --> -1
c    (-b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧ -p_1050) -> ( b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0)
c  in CNF:
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨  b^{35, 31}_2
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_1
c     b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨  b^{35, 31}_0
c  in DIMACS:
 15659  15660  15661  1050  15662 0
 15659  15660  15661  1050 -15663 0
 15659  15660  15661  1050  15664 0

c  -1-1 --> -2
c    ( b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧  b^{35, 30}_0 ∧ -p_1050) -> ( b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0)
c  in CNF:
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨  b^{35, 31}_2
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨  b^{35, 31}_1
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨  p_1050 ∨ -b^{35, 31}_0
c  in DIMACS:
-15659  15660 -15661  1050  15662 0
-15659  15660 -15661  1050  15663 0
-15659  15660 -15661  1050 -15664 0

c  -2-1 --> break 
c    ( b^{35, 30}_2 ∧  b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨  b^{35, 30}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-15659 -15660  15661  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 30}_2 ∧ -b^{35, 30}_1 ∧ -b^{35, 30}_0 ∧ true) 
c  in CNF:
c    -b^{35, 30}_2 ∨  b^{35, 30}_1 ∨  b^{35, 30}_0 ∨ false 
c  in DIMACS:
-15659  15660  15661  0

c  3 does not represent an automaton state.
c    -(-b^{35, 30}_2 ∧  b^{35, 30}_1 ∧  b^{35, 30}_0 ∧ true) 
c  in CNF:
c     b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ false 
c  in DIMACS:
 15659 -15660 -15661  0
c  -3 does not represent an automaton state.
c    -( b^{35, 30}_2 ∧  b^{35, 30}_1 ∧  b^{35, 30}_0 ∧ true) 
c  in CNF:
c    -b^{35, 30}_2 ∨ -b^{35, 30}_1 ∨ -b^{35, 30}_0 ∨ false 
c  in DIMACS:
-15659 -15660 -15661  0

c i = 31
c  -2+1 --> -1
c    ( b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧  p_1085) -> ( b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0)
c  in CNF:
c    -b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨  b^{35, 32}_2
c    -b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_1
c    -b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨  b^{35, 32}_0
c  in DIMACS:
-15662 -15663  15664 -1085  15665 0
-15662 -15663  15664 -1085 -15666 0
-15662 -15663  15664 -1085  15667 0

c  -1+1 --> 0
c    ( b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0 ∧  p_1085) -> (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧ -b^{35, 32}_0)
c  in CNF:
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_2
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_1
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_0
c  in DIMACS:
-15662  15663 -15664 -1085 -15665 0
-15662  15663 -15664 -1085 -15666 0
-15662  15663 -15664 -1085 -15667 0

c  0+1 --> 1
c    (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧  p_1085) -> (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0)
c  in CNF:
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_2
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_1
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨  b^{35, 32}_0
c  in DIMACS:
 15662  15663  15664 -1085 -15665 0
 15662  15663  15664 -1085 -15666 0
 15662  15663  15664 -1085  15667 0

c  1+1 --> 2
c    (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0 ∧  p_1085) -> (-b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0)
c  in CNF:
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_2
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨  b^{35, 32}_1
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ -p_1085 ∨ -b^{35, 32}_0
c  in DIMACS:
 15662  15663 -15664 -1085 -15665 0
 15662  15663 -15664 -1085  15666 0
 15662  15663 -15664 -1085 -15667 0

c  2+1 --> break 
c    (-b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 15662 -15663  15664 -1085 1162 0


c  2-1 --> 1
c    (-b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧ -p_1085) -> (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0)
c  in CNF:
c     b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_2
c     b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_1
c     b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨  b^{35, 32}_0
c  in DIMACS:
 15662 -15663  15664  1085 -15665 0
 15662 -15663  15664  1085 -15666 0
 15662 -15663  15664  1085  15667 0

c  1-1 --> 0
c    (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0 ∧ -p_1085) -> (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧ -b^{35, 32}_0)
c  in CNF:
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_2
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_1
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_0
c  in DIMACS:
 15662  15663 -15664  1085 -15665 0
 15662  15663 -15664  1085 -15666 0
 15662  15663 -15664  1085 -15667 0

c  0-1 --> -1
c    (-b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧ -p_1085) -> ( b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0)
c  in CNF:
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨  b^{35, 32}_2
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_1
c     b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨  b^{35, 32}_0
c  in DIMACS:
 15662  15663  15664  1085  15665 0
 15662  15663  15664  1085 -15666 0
 15662  15663  15664  1085  15667 0

c  -1-1 --> -2
c    ( b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧  b^{35, 31}_0 ∧ -p_1085) -> ( b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0)
c  in CNF:
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨  b^{35, 32}_2
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨  b^{35, 32}_1
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨  p_1085 ∨ -b^{35, 32}_0
c  in DIMACS:
-15662  15663 -15664  1085  15665 0
-15662  15663 -15664  1085  15666 0
-15662  15663 -15664  1085 -15667 0

c  -2-1 --> break 
c    ( b^{35, 31}_2 ∧  b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨  b^{35, 31}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-15662 -15663  15664  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 31}_2 ∧ -b^{35, 31}_1 ∧ -b^{35, 31}_0 ∧ true) 
c  in CNF:
c    -b^{35, 31}_2 ∨  b^{35, 31}_1 ∨  b^{35, 31}_0 ∨ false 
c  in DIMACS:
-15662  15663  15664  0

c  3 does not represent an automaton state.
c    -(-b^{35, 31}_2 ∧  b^{35, 31}_1 ∧  b^{35, 31}_0 ∧ true) 
c  in CNF:
c     b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ false 
c  in DIMACS:
 15662 -15663 -15664  0
c  -3 does not represent an automaton state.
c    -( b^{35, 31}_2 ∧  b^{35, 31}_1 ∧  b^{35, 31}_0 ∧ true) 
c  in CNF:
c    -b^{35, 31}_2 ∨ -b^{35, 31}_1 ∨ -b^{35, 31}_0 ∨ false 
c  in DIMACS:
-15662 -15663 -15664  0

c i = 32
c  -2+1 --> -1
c    ( b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧  p_1120) -> ( b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0)
c  in CNF:
c    -b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨  b^{35, 33}_2
c    -b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_1
c    -b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨  b^{35, 33}_0
c  in DIMACS:
-15665 -15666  15667 -1120  15668 0
-15665 -15666  15667 -1120 -15669 0
-15665 -15666  15667 -1120  15670 0

c  -1+1 --> 0
c    ( b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0 ∧  p_1120) -> (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧ -b^{35, 33}_0)
c  in CNF:
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_2
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_1
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_0
c  in DIMACS:
-15665  15666 -15667 -1120 -15668 0
-15665  15666 -15667 -1120 -15669 0
-15665  15666 -15667 -1120 -15670 0

c  0+1 --> 1
c    (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧  p_1120) -> (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0)
c  in CNF:
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_2
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_1
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨  b^{35, 33}_0
c  in DIMACS:
 15665  15666  15667 -1120 -15668 0
 15665  15666  15667 -1120 -15669 0
 15665  15666  15667 -1120  15670 0

c  1+1 --> 2
c    (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0 ∧  p_1120) -> (-b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0)
c  in CNF:
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_2
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨  b^{35, 33}_1
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ -p_1120 ∨ -b^{35, 33}_0
c  in DIMACS:
 15665  15666 -15667 -1120 -15668 0
 15665  15666 -15667 -1120  15669 0
 15665  15666 -15667 -1120 -15670 0

c  2+1 --> break 
c    (-b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 15665 -15666  15667 -1120 1162 0


c  2-1 --> 1
c    (-b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧ -p_1120) -> (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0)
c  in CNF:
c     b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_2
c     b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_1
c     b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨  b^{35, 33}_0
c  in DIMACS:
 15665 -15666  15667  1120 -15668 0
 15665 -15666  15667  1120 -15669 0
 15665 -15666  15667  1120  15670 0

c  1-1 --> 0
c    (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0 ∧ -p_1120) -> (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧ -b^{35, 33}_0)
c  in CNF:
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_2
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_1
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_0
c  in DIMACS:
 15665  15666 -15667  1120 -15668 0
 15665  15666 -15667  1120 -15669 0
 15665  15666 -15667  1120 -15670 0

c  0-1 --> -1
c    (-b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧ -p_1120) -> ( b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0)
c  in CNF:
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨  b^{35, 33}_2
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_1
c     b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨  b^{35, 33}_0
c  in DIMACS:
 15665  15666  15667  1120  15668 0
 15665  15666  15667  1120 -15669 0
 15665  15666  15667  1120  15670 0

c  -1-1 --> -2
c    ( b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧  b^{35, 32}_0 ∧ -p_1120) -> ( b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0)
c  in CNF:
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨  b^{35, 33}_2
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨  b^{35, 33}_1
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨  p_1120 ∨ -b^{35, 33}_0
c  in DIMACS:
-15665  15666 -15667  1120  15668 0
-15665  15666 -15667  1120  15669 0
-15665  15666 -15667  1120 -15670 0

c  -2-1 --> break 
c    ( b^{35, 32}_2 ∧  b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨  b^{35, 32}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-15665 -15666  15667  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 32}_2 ∧ -b^{35, 32}_1 ∧ -b^{35, 32}_0 ∧ true) 
c  in CNF:
c    -b^{35, 32}_2 ∨  b^{35, 32}_1 ∨  b^{35, 32}_0 ∨ false 
c  in DIMACS:
-15665  15666  15667  0

c  3 does not represent an automaton state.
c    -(-b^{35, 32}_2 ∧  b^{35, 32}_1 ∧  b^{35, 32}_0 ∧ true) 
c  in CNF:
c     b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ false 
c  in DIMACS:
 15665 -15666 -15667  0
c  -3 does not represent an automaton state.
c    -( b^{35, 32}_2 ∧  b^{35, 32}_1 ∧  b^{35, 32}_0 ∧ true) 
c  in CNF:
c    -b^{35, 32}_2 ∨ -b^{35, 32}_1 ∨ -b^{35, 32}_0 ∨ false 
c  in DIMACS:
-15665 -15666 -15667  0

c i = 33
c  -2+1 --> -1
c    ( b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧  p_1155) -> ( b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧  b^{35, 34}_0)
c  in CNF:
c    -b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨  b^{35, 34}_2
c    -b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_1
c    -b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨  b^{35, 34}_0
c  in DIMACS:
-15668 -15669  15670 -1155  15671 0
-15668 -15669  15670 -1155 -15672 0
-15668 -15669  15670 -1155  15673 0

c  -1+1 --> 0
c    ( b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0 ∧  p_1155) -> (-b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧ -b^{35, 34}_0)
c  in CNF:
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_2
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_1
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_0
c  in DIMACS:
-15668  15669 -15670 -1155 -15671 0
-15668  15669 -15670 -1155 -15672 0
-15668  15669 -15670 -1155 -15673 0

c  0+1 --> 1
c    (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧  p_1155) -> (-b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧  b^{35, 34}_0)
c  in CNF:
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_2
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_1
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨  b^{35, 34}_0
c  in DIMACS:
 15668  15669  15670 -1155 -15671 0
 15668  15669  15670 -1155 -15672 0
 15668  15669  15670 -1155  15673 0

c  1+1 --> 2
c    (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0 ∧  p_1155) -> (-b^{35, 34}_2 ∧  b^{35, 34}_1 ∧ -b^{35, 34}_0)
c  in CNF:
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_2
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨  b^{35, 34}_1
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ -p_1155 ∨ -b^{35, 34}_0
c  in DIMACS:
 15668  15669 -15670 -1155 -15671 0
 15668  15669 -15670 -1155  15672 0
 15668  15669 -15670 -1155 -15673 0

c  2+1 --> break 
c    (-b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 15668 -15669  15670 -1155 1162 0


c  2-1 --> 1
c    (-b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧ -p_1155) -> (-b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧  b^{35, 34}_0)
c  in CNF:
c     b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_2
c     b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_1
c     b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨  b^{35, 34}_0
c  in DIMACS:
 15668 -15669  15670  1155 -15671 0
 15668 -15669  15670  1155 -15672 0
 15668 -15669  15670  1155  15673 0

c  1-1 --> 0
c    (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0 ∧ -p_1155) -> (-b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧ -b^{35, 34}_0)
c  in CNF:
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_2
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_1
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_0
c  in DIMACS:
 15668  15669 -15670  1155 -15671 0
 15668  15669 -15670  1155 -15672 0
 15668  15669 -15670  1155 -15673 0

c  0-1 --> -1
c    (-b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧ -p_1155) -> ( b^{35, 34}_2 ∧ -b^{35, 34}_1 ∧  b^{35, 34}_0)
c  in CNF:
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨  b^{35, 34}_2
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_1
c     b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨  b^{35, 34}_0
c  in DIMACS:
 15668  15669  15670  1155  15671 0
 15668  15669  15670  1155 -15672 0
 15668  15669  15670  1155  15673 0

c  -1-1 --> -2
c    ( b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧  b^{35, 33}_0 ∧ -p_1155) -> ( b^{35, 34}_2 ∧  b^{35, 34}_1 ∧ -b^{35, 34}_0)
c  in CNF:
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨  b^{35, 34}_2
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨  b^{35, 34}_1
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨  p_1155 ∨ -b^{35, 34}_0
c  in DIMACS:
-15668  15669 -15670  1155  15671 0
-15668  15669 -15670  1155  15672 0
-15668  15669 -15670  1155 -15673 0

c  -2-1 --> break 
c    ( b^{35, 33}_2 ∧  b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨  b^{35, 33}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-15668 -15669  15670  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{35, 33}_2 ∧ -b^{35, 33}_1 ∧ -b^{35, 33}_0 ∧ true) 
c  in CNF:
c    -b^{35, 33}_2 ∨  b^{35, 33}_1 ∨  b^{35, 33}_0 ∨ false 
c  in DIMACS:
-15668  15669  15670  0

c  3 does not represent an automaton state.
c    -(-b^{35, 33}_2 ∧  b^{35, 33}_1 ∧  b^{35, 33}_0 ∧ true) 
c  in CNF:
c     b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ false 
c  in DIMACS:
 15668 -15669 -15670  0
c  -3 does not represent an automaton state.
c    -( b^{35, 33}_2 ∧  b^{35, 33}_1 ∧  b^{35, 33}_0 ∧ true) 
c  in CNF:
c    -b^{35, 33}_2 ∨ -b^{35, 33}_1 ∨ -b^{35, 33}_0 ∨ false 
c  in DIMACS:
-15668 -15669 -15670  0

c INIT for k = 36
c    -b^{36, 1}_2
c    -b^{36, 1}_1
c    -b^{36, 1}_0
c  in DIMACS:
-15674 0
-15675 0
-15676 0

c Transitions for k = 36
c i = 1
c  -2+1 --> -1
c    ( b^{36, 1}_2 ∧  b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧  p_36) -> ( b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0)
c  in CNF:
c    -b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨  b^{36, 2}_2
c    -b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_1
c    -b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨  b^{36, 2}_0
c  in DIMACS:
-15674 -15675  15676 -36  15677 0
-15674 -15675  15676 -36 -15678 0
-15674 -15675  15676 -36  15679 0

c  -1+1 --> 0
c    ( b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧  b^{36, 1}_0 ∧  p_36) -> (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧ -b^{36, 2}_0)
c  in CNF:
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_2
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_1
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_0
c  in DIMACS:
-15674  15675 -15676 -36 -15677 0
-15674  15675 -15676 -36 -15678 0
-15674  15675 -15676 -36 -15679 0

c  0+1 --> 1
c    (-b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧  p_36) -> (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0)
c  in CNF:
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_2
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_1
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨  b^{36, 2}_0
c  in DIMACS:
 15674  15675  15676 -36 -15677 0
 15674  15675  15676 -36 -15678 0
 15674  15675  15676 -36  15679 0

c  1+1 --> 2
c    (-b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧  b^{36, 1}_0 ∧  p_36) -> (-b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0)
c  in CNF:
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_2
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨  b^{36, 2}_1
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ -p_36 ∨ -b^{36, 2}_0
c  in DIMACS:
 15674  15675 -15676 -36 -15677 0
 15674  15675 -15676 -36  15678 0
 15674  15675 -15676 -36 -15679 0

c  2+1 --> break 
c    (-b^{36, 1}_2 ∧  b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧  p_36) -> break
c  in CNF:
c     b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ -p_36 ∨ break
c  in DIMACS:
 15674 -15675  15676 -36 1162 0


c  2-1 --> 1
c    (-b^{36, 1}_2 ∧  b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧ -p_36) -> (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0)
c  in CNF:
c     b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_2
c     b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_1
c     b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨  b^{36, 2}_0
c  in DIMACS:
 15674 -15675  15676  36 -15677 0
 15674 -15675  15676  36 -15678 0
 15674 -15675  15676  36  15679 0

c  1-1 --> 0
c    (-b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧  b^{36, 1}_0 ∧ -p_36) -> (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧ -b^{36, 2}_0)
c  in CNF:
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_2
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_1
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_0
c  in DIMACS:
 15674  15675 -15676  36 -15677 0
 15674  15675 -15676  36 -15678 0
 15674  15675 -15676  36 -15679 0

c  0-1 --> -1
c    (-b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧ -p_36) -> ( b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0)
c  in CNF:
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨  b^{36, 2}_2
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_1
c     b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨  b^{36, 2}_0
c  in DIMACS:
 15674  15675  15676  36  15677 0
 15674  15675  15676  36 -15678 0
 15674  15675  15676  36  15679 0

c  -1-1 --> -2
c    ( b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧  b^{36, 1}_0 ∧ -p_36) -> ( b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0)
c  in CNF:
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨  b^{36, 2}_2
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨  b^{36, 2}_1
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨  p_36 ∨ -b^{36, 2}_0
c  in DIMACS:
-15674  15675 -15676  36  15677 0
-15674  15675 -15676  36  15678 0
-15674  15675 -15676  36 -15679 0

c  -2-1 --> break 
c    ( b^{36, 1}_2 ∧  b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧ -p_36) -> break
c  in CNF:
c    -b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨  b^{36, 1}_0 ∨  p_36 ∨ break
c  in DIMACS:
-15674 -15675  15676  36 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 1}_2 ∧ -b^{36, 1}_1 ∧ -b^{36, 1}_0 ∧ true) 
c  in CNF:
c    -b^{36, 1}_2 ∨  b^{36, 1}_1 ∨  b^{36, 1}_0 ∨ false 
c  in DIMACS:
-15674  15675  15676  0

c  3 does not represent an automaton state.
c    -(-b^{36, 1}_2 ∧  b^{36, 1}_1 ∧  b^{36, 1}_0 ∧ true) 
c  in CNF:
c     b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ false 
c  in DIMACS:
 15674 -15675 -15676  0
c  -3 does not represent an automaton state.
c    -( b^{36, 1}_2 ∧  b^{36, 1}_1 ∧  b^{36, 1}_0 ∧ true) 
c  in CNF:
c    -b^{36, 1}_2 ∨ -b^{36, 1}_1 ∨ -b^{36, 1}_0 ∨ false 
c  in DIMACS:
-15674 -15675 -15676  0

c i = 2
c  -2+1 --> -1
c    ( b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧  p_72) -> ( b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0)
c  in CNF:
c    -b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨  b^{36, 3}_2
c    -b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_1
c    -b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨  b^{36, 3}_0
c  in DIMACS:
-15677 -15678  15679 -72  15680 0
-15677 -15678  15679 -72 -15681 0
-15677 -15678  15679 -72  15682 0

c  -1+1 --> 0
c    ( b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0 ∧  p_72) -> (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧ -b^{36, 3}_0)
c  in CNF:
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_2
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_1
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_0
c  in DIMACS:
-15677  15678 -15679 -72 -15680 0
-15677  15678 -15679 -72 -15681 0
-15677  15678 -15679 -72 -15682 0

c  0+1 --> 1
c    (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧  p_72) -> (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0)
c  in CNF:
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_2
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_1
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨  b^{36, 3}_0
c  in DIMACS:
 15677  15678  15679 -72 -15680 0
 15677  15678  15679 -72 -15681 0
 15677  15678  15679 -72  15682 0

c  1+1 --> 2
c    (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0 ∧  p_72) -> (-b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0)
c  in CNF:
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_2
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨  b^{36, 3}_1
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ -p_72 ∨ -b^{36, 3}_0
c  in DIMACS:
 15677  15678 -15679 -72 -15680 0
 15677  15678 -15679 -72  15681 0
 15677  15678 -15679 -72 -15682 0

c  2+1 --> break 
c    (-b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧  p_72) -> break
c  in CNF:
c     b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 15677 -15678  15679 -72 1162 0


c  2-1 --> 1
c    (-b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧ -p_72) -> (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0)
c  in CNF:
c     b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_2
c     b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_1
c     b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨  b^{36, 3}_0
c  in DIMACS:
 15677 -15678  15679  72 -15680 0
 15677 -15678  15679  72 -15681 0
 15677 -15678  15679  72  15682 0

c  1-1 --> 0
c    (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0 ∧ -p_72) -> (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧ -b^{36, 3}_0)
c  in CNF:
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_2
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_1
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_0
c  in DIMACS:
 15677  15678 -15679  72 -15680 0
 15677  15678 -15679  72 -15681 0
 15677  15678 -15679  72 -15682 0

c  0-1 --> -1
c    (-b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧ -p_72) -> ( b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0)
c  in CNF:
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨  b^{36, 3}_2
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_1
c     b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨  b^{36, 3}_0
c  in DIMACS:
 15677  15678  15679  72  15680 0
 15677  15678  15679  72 -15681 0
 15677  15678  15679  72  15682 0

c  -1-1 --> -2
c    ( b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧  b^{36, 2}_0 ∧ -p_72) -> ( b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0)
c  in CNF:
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨  b^{36, 3}_2
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨  b^{36, 3}_1
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨  p_72 ∨ -b^{36, 3}_0
c  in DIMACS:
-15677  15678 -15679  72  15680 0
-15677  15678 -15679  72  15681 0
-15677  15678 -15679  72 -15682 0

c  -2-1 --> break 
c    ( b^{36, 2}_2 ∧  b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨  b^{36, 2}_0 ∨  p_72 ∨ break
c  in DIMACS:
-15677 -15678  15679  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 2}_2 ∧ -b^{36, 2}_1 ∧ -b^{36, 2}_0 ∧ true) 
c  in CNF:
c    -b^{36, 2}_2 ∨  b^{36, 2}_1 ∨  b^{36, 2}_0 ∨ false 
c  in DIMACS:
-15677  15678  15679  0

c  3 does not represent an automaton state.
c    -(-b^{36, 2}_2 ∧  b^{36, 2}_1 ∧  b^{36, 2}_0 ∧ true) 
c  in CNF:
c     b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ false 
c  in DIMACS:
 15677 -15678 -15679  0
c  -3 does not represent an automaton state.
c    -( b^{36, 2}_2 ∧  b^{36, 2}_1 ∧  b^{36, 2}_0 ∧ true) 
c  in CNF:
c    -b^{36, 2}_2 ∨ -b^{36, 2}_1 ∨ -b^{36, 2}_0 ∨ false 
c  in DIMACS:
-15677 -15678 -15679  0

c i = 3
c  -2+1 --> -1
c    ( b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧  p_108) -> ( b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0)
c  in CNF:
c    -b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨  b^{36, 4}_2
c    -b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_1
c    -b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨  b^{36, 4}_0
c  in DIMACS:
-15680 -15681  15682 -108  15683 0
-15680 -15681  15682 -108 -15684 0
-15680 -15681  15682 -108  15685 0

c  -1+1 --> 0
c    ( b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0 ∧  p_108) -> (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧ -b^{36, 4}_0)
c  in CNF:
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_2
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_1
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_0
c  in DIMACS:
-15680  15681 -15682 -108 -15683 0
-15680  15681 -15682 -108 -15684 0
-15680  15681 -15682 -108 -15685 0

c  0+1 --> 1
c    (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧  p_108) -> (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0)
c  in CNF:
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_2
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_1
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨  b^{36, 4}_0
c  in DIMACS:
 15680  15681  15682 -108 -15683 0
 15680  15681  15682 -108 -15684 0
 15680  15681  15682 -108  15685 0

c  1+1 --> 2
c    (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0 ∧  p_108) -> (-b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0)
c  in CNF:
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_2
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨  b^{36, 4}_1
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ -p_108 ∨ -b^{36, 4}_0
c  in DIMACS:
 15680  15681 -15682 -108 -15683 0
 15680  15681 -15682 -108  15684 0
 15680  15681 -15682 -108 -15685 0

c  2+1 --> break 
c    (-b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧  p_108) -> break
c  in CNF:
c     b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 15680 -15681  15682 -108 1162 0


c  2-1 --> 1
c    (-b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧ -p_108) -> (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0)
c  in CNF:
c     b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_2
c     b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_1
c     b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨  b^{36, 4}_0
c  in DIMACS:
 15680 -15681  15682  108 -15683 0
 15680 -15681  15682  108 -15684 0
 15680 -15681  15682  108  15685 0

c  1-1 --> 0
c    (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0 ∧ -p_108) -> (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧ -b^{36, 4}_0)
c  in CNF:
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_2
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_1
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_0
c  in DIMACS:
 15680  15681 -15682  108 -15683 0
 15680  15681 -15682  108 -15684 0
 15680  15681 -15682  108 -15685 0

c  0-1 --> -1
c    (-b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧ -p_108) -> ( b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0)
c  in CNF:
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨  b^{36, 4}_2
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_1
c     b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨  b^{36, 4}_0
c  in DIMACS:
 15680  15681  15682  108  15683 0
 15680  15681  15682  108 -15684 0
 15680  15681  15682  108  15685 0

c  -1-1 --> -2
c    ( b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧  b^{36, 3}_0 ∧ -p_108) -> ( b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0)
c  in CNF:
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨  b^{36, 4}_2
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨  b^{36, 4}_1
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨  p_108 ∨ -b^{36, 4}_0
c  in DIMACS:
-15680  15681 -15682  108  15683 0
-15680  15681 -15682  108  15684 0
-15680  15681 -15682  108 -15685 0

c  -2-1 --> break 
c    ( b^{36, 3}_2 ∧  b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨  b^{36, 3}_0 ∨  p_108 ∨ break
c  in DIMACS:
-15680 -15681  15682  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 3}_2 ∧ -b^{36, 3}_1 ∧ -b^{36, 3}_0 ∧ true) 
c  in CNF:
c    -b^{36, 3}_2 ∨  b^{36, 3}_1 ∨  b^{36, 3}_0 ∨ false 
c  in DIMACS:
-15680  15681  15682  0

c  3 does not represent an automaton state.
c    -(-b^{36, 3}_2 ∧  b^{36, 3}_1 ∧  b^{36, 3}_0 ∧ true) 
c  in CNF:
c     b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ false 
c  in DIMACS:
 15680 -15681 -15682  0
c  -3 does not represent an automaton state.
c    -( b^{36, 3}_2 ∧  b^{36, 3}_1 ∧  b^{36, 3}_0 ∧ true) 
c  in CNF:
c    -b^{36, 3}_2 ∨ -b^{36, 3}_1 ∨ -b^{36, 3}_0 ∨ false 
c  in DIMACS:
-15680 -15681 -15682  0

c i = 4
c  -2+1 --> -1
c    ( b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧  p_144) -> ( b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0)
c  in CNF:
c    -b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨  b^{36, 5}_2
c    -b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_1
c    -b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨  b^{36, 5}_0
c  in DIMACS:
-15683 -15684  15685 -144  15686 0
-15683 -15684  15685 -144 -15687 0
-15683 -15684  15685 -144  15688 0

c  -1+1 --> 0
c    ( b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0 ∧  p_144) -> (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧ -b^{36, 5}_0)
c  in CNF:
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_2
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_1
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_0
c  in DIMACS:
-15683  15684 -15685 -144 -15686 0
-15683  15684 -15685 -144 -15687 0
-15683  15684 -15685 -144 -15688 0

c  0+1 --> 1
c    (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧  p_144) -> (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0)
c  in CNF:
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_2
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_1
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨  b^{36, 5}_0
c  in DIMACS:
 15683  15684  15685 -144 -15686 0
 15683  15684  15685 -144 -15687 0
 15683  15684  15685 -144  15688 0

c  1+1 --> 2
c    (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0 ∧  p_144) -> (-b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0)
c  in CNF:
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_2
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨  b^{36, 5}_1
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ -p_144 ∨ -b^{36, 5}_0
c  in DIMACS:
 15683  15684 -15685 -144 -15686 0
 15683  15684 -15685 -144  15687 0
 15683  15684 -15685 -144 -15688 0

c  2+1 --> break 
c    (-b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧  p_144) -> break
c  in CNF:
c     b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 15683 -15684  15685 -144 1162 0


c  2-1 --> 1
c    (-b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧ -p_144) -> (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0)
c  in CNF:
c     b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_2
c     b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_1
c     b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨  b^{36, 5}_0
c  in DIMACS:
 15683 -15684  15685  144 -15686 0
 15683 -15684  15685  144 -15687 0
 15683 -15684  15685  144  15688 0

c  1-1 --> 0
c    (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0 ∧ -p_144) -> (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧ -b^{36, 5}_0)
c  in CNF:
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_2
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_1
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_0
c  in DIMACS:
 15683  15684 -15685  144 -15686 0
 15683  15684 -15685  144 -15687 0
 15683  15684 -15685  144 -15688 0

c  0-1 --> -1
c    (-b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧ -p_144) -> ( b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0)
c  in CNF:
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨  b^{36, 5}_2
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_1
c     b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨  b^{36, 5}_0
c  in DIMACS:
 15683  15684  15685  144  15686 0
 15683  15684  15685  144 -15687 0
 15683  15684  15685  144  15688 0

c  -1-1 --> -2
c    ( b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧  b^{36, 4}_0 ∧ -p_144) -> ( b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0)
c  in CNF:
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨  b^{36, 5}_2
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨  b^{36, 5}_1
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨  p_144 ∨ -b^{36, 5}_0
c  in DIMACS:
-15683  15684 -15685  144  15686 0
-15683  15684 -15685  144  15687 0
-15683  15684 -15685  144 -15688 0

c  -2-1 --> break 
c    ( b^{36, 4}_2 ∧  b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨  b^{36, 4}_0 ∨  p_144 ∨ break
c  in DIMACS:
-15683 -15684  15685  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 4}_2 ∧ -b^{36, 4}_1 ∧ -b^{36, 4}_0 ∧ true) 
c  in CNF:
c    -b^{36, 4}_2 ∨  b^{36, 4}_1 ∨  b^{36, 4}_0 ∨ false 
c  in DIMACS:
-15683  15684  15685  0

c  3 does not represent an automaton state.
c    -(-b^{36, 4}_2 ∧  b^{36, 4}_1 ∧  b^{36, 4}_0 ∧ true) 
c  in CNF:
c     b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ false 
c  in DIMACS:
 15683 -15684 -15685  0
c  -3 does not represent an automaton state.
c    -( b^{36, 4}_2 ∧  b^{36, 4}_1 ∧  b^{36, 4}_0 ∧ true) 
c  in CNF:
c    -b^{36, 4}_2 ∨ -b^{36, 4}_1 ∨ -b^{36, 4}_0 ∨ false 
c  in DIMACS:
-15683 -15684 -15685  0

c i = 5
c  -2+1 --> -1
c    ( b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧  p_180) -> ( b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0)
c  in CNF:
c    -b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨  b^{36, 6}_2
c    -b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_1
c    -b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨  b^{36, 6}_0
c  in DIMACS:
-15686 -15687  15688 -180  15689 0
-15686 -15687  15688 -180 -15690 0
-15686 -15687  15688 -180  15691 0

c  -1+1 --> 0
c    ( b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0 ∧  p_180) -> (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧ -b^{36, 6}_0)
c  in CNF:
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_2
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_1
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_0
c  in DIMACS:
-15686  15687 -15688 -180 -15689 0
-15686  15687 -15688 -180 -15690 0
-15686  15687 -15688 -180 -15691 0

c  0+1 --> 1
c    (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧  p_180) -> (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0)
c  in CNF:
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_2
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_1
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨  b^{36, 6}_0
c  in DIMACS:
 15686  15687  15688 -180 -15689 0
 15686  15687  15688 -180 -15690 0
 15686  15687  15688 -180  15691 0

c  1+1 --> 2
c    (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0 ∧  p_180) -> (-b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0)
c  in CNF:
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_2
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨  b^{36, 6}_1
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ -p_180 ∨ -b^{36, 6}_0
c  in DIMACS:
 15686  15687 -15688 -180 -15689 0
 15686  15687 -15688 -180  15690 0
 15686  15687 -15688 -180 -15691 0

c  2+1 --> break 
c    (-b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧  p_180) -> break
c  in CNF:
c     b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 15686 -15687  15688 -180 1162 0


c  2-1 --> 1
c    (-b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧ -p_180) -> (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0)
c  in CNF:
c     b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_2
c     b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_1
c     b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨  b^{36, 6}_0
c  in DIMACS:
 15686 -15687  15688  180 -15689 0
 15686 -15687  15688  180 -15690 0
 15686 -15687  15688  180  15691 0

c  1-1 --> 0
c    (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0 ∧ -p_180) -> (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧ -b^{36, 6}_0)
c  in CNF:
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_2
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_1
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_0
c  in DIMACS:
 15686  15687 -15688  180 -15689 0
 15686  15687 -15688  180 -15690 0
 15686  15687 -15688  180 -15691 0

c  0-1 --> -1
c    (-b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧ -p_180) -> ( b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0)
c  in CNF:
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨  b^{36, 6}_2
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_1
c     b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨  b^{36, 6}_0
c  in DIMACS:
 15686  15687  15688  180  15689 0
 15686  15687  15688  180 -15690 0
 15686  15687  15688  180  15691 0

c  -1-1 --> -2
c    ( b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧  b^{36, 5}_0 ∧ -p_180) -> ( b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0)
c  in CNF:
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨  b^{36, 6}_2
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨  b^{36, 6}_1
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨  p_180 ∨ -b^{36, 6}_0
c  in DIMACS:
-15686  15687 -15688  180  15689 0
-15686  15687 -15688  180  15690 0
-15686  15687 -15688  180 -15691 0

c  -2-1 --> break 
c    ( b^{36, 5}_2 ∧  b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨  b^{36, 5}_0 ∨  p_180 ∨ break
c  in DIMACS:
-15686 -15687  15688  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 5}_2 ∧ -b^{36, 5}_1 ∧ -b^{36, 5}_0 ∧ true) 
c  in CNF:
c    -b^{36, 5}_2 ∨  b^{36, 5}_1 ∨  b^{36, 5}_0 ∨ false 
c  in DIMACS:
-15686  15687  15688  0

c  3 does not represent an automaton state.
c    -(-b^{36, 5}_2 ∧  b^{36, 5}_1 ∧  b^{36, 5}_0 ∧ true) 
c  in CNF:
c     b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ false 
c  in DIMACS:
 15686 -15687 -15688  0
c  -3 does not represent an automaton state.
c    -( b^{36, 5}_2 ∧  b^{36, 5}_1 ∧  b^{36, 5}_0 ∧ true) 
c  in CNF:
c    -b^{36, 5}_2 ∨ -b^{36, 5}_1 ∨ -b^{36, 5}_0 ∨ false 
c  in DIMACS:
-15686 -15687 -15688  0

c i = 6
c  -2+1 --> -1
c    ( b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧  p_216) -> ( b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0)
c  in CNF:
c    -b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨  b^{36, 7}_2
c    -b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_1
c    -b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨  b^{36, 7}_0
c  in DIMACS:
-15689 -15690  15691 -216  15692 0
-15689 -15690  15691 -216 -15693 0
-15689 -15690  15691 -216  15694 0

c  -1+1 --> 0
c    ( b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0 ∧  p_216) -> (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧ -b^{36, 7}_0)
c  in CNF:
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_2
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_1
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_0
c  in DIMACS:
-15689  15690 -15691 -216 -15692 0
-15689  15690 -15691 -216 -15693 0
-15689  15690 -15691 -216 -15694 0

c  0+1 --> 1
c    (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧  p_216) -> (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0)
c  in CNF:
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_2
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_1
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨  b^{36, 7}_0
c  in DIMACS:
 15689  15690  15691 -216 -15692 0
 15689  15690  15691 -216 -15693 0
 15689  15690  15691 -216  15694 0

c  1+1 --> 2
c    (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0 ∧  p_216) -> (-b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0)
c  in CNF:
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_2
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨  b^{36, 7}_1
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ -p_216 ∨ -b^{36, 7}_0
c  in DIMACS:
 15689  15690 -15691 -216 -15692 0
 15689  15690 -15691 -216  15693 0
 15689  15690 -15691 -216 -15694 0

c  2+1 --> break 
c    (-b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧  p_216) -> break
c  in CNF:
c     b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 15689 -15690  15691 -216 1162 0


c  2-1 --> 1
c    (-b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧ -p_216) -> (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0)
c  in CNF:
c     b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_2
c     b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_1
c     b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨  b^{36, 7}_0
c  in DIMACS:
 15689 -15690  15691  216 -15692 0
 15689 -15690  15691  216 -15693 0
 15689 -15690  15691  216  15694 0

c  1-1 --> 0
c    (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0 ∧ -p_216) -> (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧ -b^{36, 7}_0)
c  in CNF:
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_2
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_1
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_0
c  in DIMACS:
 15689  15690 -15691  216 -15692 0
 15689  15690 -15691  216 -15693 0
 15689  15690 -15691  216 -15694 0

c  0-1 --> -1
c    (-b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧ -p_216) -> ( b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0)
c  in CNF:
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨  b^{36, 7}_2
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_1
c     b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨  b^{36, 7}_0
c  in DIMACS:
 15689  15690  15691  216  15692 0
 15689  15690  15691  216 -15693 0
 15689  15690  15691  216  15694 0

c  -1-1 --> -2
c    ( b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧  b^{36, 6}_0 ∧ -p_216) -> ( b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0)
c  in CNF:
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨  b^{36, 7}_2
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨  b^{36, 7}_1
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨  p_216 ∨ -b^{36, 7}_0
c  in DIMACS:
-15689  15690 -15691  216  15692 0
-15689  15690 -15691  216  15693 0
-15689  15690 -15691  216 -15694 0

c  -2-1 --> break 
c    ( b^{36, 6}_2 ∧  b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨  b^{36, 6}_0 ∨  p_216 ∨ break
c  in DIMACS:
-15689 -15690  15691  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 6}_2 ∧ -b^{36, 6}_1 ∧ -b^{36, 6}_0 ∧ true) 
c  in CNF:
c    -b^{36, 6}_2 ∨  b^{36, 6}_1 ∨  b^{36, 6}_0 ∨ false 
c  in DIMACS:
-15689  15690  15691  0

c  3 does not represent an automaton state.
c    -(-b^{36, 6}_2 ∧  b^{36, 6}_1 ∧  b^{36, 6}_0 ∧ true) 
c  in CNF:
c     b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ false 
c  in DIMACS:
 15689 -15690 -15691  0
c  -3 does not represent an automaton state.
c    -( b^{36, 6}_2 ∧  b^{36, 6}_1 ∧  b^{36, 6}_0 ∧ true) 
c  in CNF:
c    -b^{36, 6}_2 ∨ -b^{36, 6}_1 ∨ -b^{36, 6}_0 ∨ false 
c  in DIMACS:
-15689 -15690 -15691  0

c i = 7
c  -2+1 --> -1
c    ( b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧  p_252) -> ( b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0)
c  in CNF:
c    -b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨  b^{36, 8}_2
c    -b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_1
c    -b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨  b^{36, 8}_0
c  in DIMACS:
-15692 -15693  15694 -252  15695 0
-15692 -15693  15694 -252 -15696 0
-15692 -15693  15694 -252  15697 0

c  -1+1 --> 0
c    ( b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0 ∧  p_252) -> (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧ -b^{36, 8}_0)
c  in CNF:
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_2
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_1
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_0
c  in DIMACS:
-15692  15693 -15694 -252 -15695 0
-15692  15693 -15694 -252 -15696 0
-15692  15693 -15694 -252 -15697 0

c  0+1 --> 1
c    (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧  p_252) -> (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0)
c  in CNF:
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_2
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_1
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨  b^{36, 8}_0
c  in DIMACS:
 15692  15693  15694 -252 -15695 0
 15692  15693  15694 -252 -15696 0
 15692  15693  15694 -252  15697 0

c  1+1 --> 2
c    (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0 ∧  p_252) -> (-b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0)
c  in CNF:
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_2
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨  b^{36, 8}_1
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ -p_252 ∨ -b^{36, 8}_0
c  in DIMACS:
 15692  15693 -15694 -252 -15695 0
 15692  15693 -15694 -252  15696 0
 15692  15693 -15694 -252 -15697 0

c  2+1 --> break 
c    (-b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧  p_252) -> break
c  in CNF:
c     b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 15692 -15693  15694 -252 1162 0


c  2-1 --> 1
c    (-b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧ -p_252) -> (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0)
c  in CNF:
c     b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_2
c     b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_1
c     b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨  b^{36, 8}_0
c  in DIMACS:
 15692 -15693  15694  252 -15695 0
 15692 -15693  15694  252 -15696 0
 15692 -15693  15694  252  15697 0

c  1-1 --> 0
c    (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0 ∧ -p_252) -> (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧ -b^{36, 8}_0)
c  in CNF:
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_2
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_1
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_0
c  in DIMACS:
 15692  15693 -15694  252 -15695 0
 15692  15693 -15694  252 -15696 0
 15692  15693 -15694  252 -15697 0

c  0-1 --> -1
c    (-b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧ -p_252) -> ( b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0)
c  in CNF:
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨  b^{36, 8}_2
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_1
c     b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨  b^{36, 8}_0
c  in DIMACS:
 15692  15693  15694  252  15695 0
 15692  15693  15694  252 -15696 0
 15692  15693  15694  252  15697 0

c  -1-1 --> -2
c    ( b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧  b^{36, 7}_0 ∧ -p_252) -> ( b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0)
c  in CNF:
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨  b^{36, 8}_2
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨  b^{36, 8}_1
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨  p_252 ∨ -b^{36, 8}_0
c  in DIMACS:
-15692  15693 -15694  252  15695 0
-15692  15693 -15694  252  15696 0
-15692  15693 -15694  252 -15697 0

c  -2-1 --> break 
c    ( b^{36, 7}_2 ∧  b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨  b^{36, 7}_0 ∨  p_252 ∨ break
c  in DIMACS:
-15692 -15693  15694  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 7}_2 ∧ -b^{36, 7}_1 ∧ -b^{36, 7}_0 ∧ true) 
c  in CNF:
c    -b^{36, 7}_2 ∨  b^{36, 7}_1 ∨  b^{36, 7}_0 ∨ false 
c  in DIMACS:
-15692  15693  15694  0

c  3 does not represent an automaton state.
c    -(-b^{36, 7}_2 ∧  b^{36, 7}_1 ∧  b^{36, 7}_0 ∧ true) 
c  in CNF:
c     b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ false 
c  in DIMACS:
 15692 -15693 -15694  0
c  -3 does not represent an automaton state.
c    -( b^{36, 7}_2 ∧  b^{36, 7}_1 ∧  b^{36, 7}_0 ∧ true) 
c  in CNF:
c    -b^{36, 7}_2 ∨ -b^{36, 7}_1 ∨ -b^{36, 7}_0 ∨ false 
c  in DIMACS:
-15692 -15693 -15694  0

c i = 8
c  -2+1 --> -1
c    ( b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧  p_288) -> ( b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0)
c  in CNF:
c    -b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨  b^{36, 9}_2
c    -b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_1
c    -b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨  b^{36, 9}_0
c  in DIMACS:
-15695 -15696  15697 -288  15698 0
-15695 -15696  15697 -288 -15699 0
-15695 -15696  15697 -288  15700 0

c  -1+1 --> 0
c    ( b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0 ∧  p_288) -> (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧ -b^{36, 9}_0)
c  in CNF:
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_2
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_1
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_0
c  in DIMACS:
-15695  15696 -15697 -288 -15698 0
-15695  15696 -15697 -288 -15699 0
-15695  15696 -15697 -288 -15700 0

c  0+1 --> 1
c    (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧  p_288) -> (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0)
c  in CNF:
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_2
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_1
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨  b^{36, 9}_0
c  in DIMACS:
 15695  15696  15697 -288 -15698 0
 15695  15696  15697 -288 -15699 0
 15695  15696  15697 -288  15700 0

c  1+1 --> 2
c    (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0 ∧  p_288) -> (-b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0)
c  in CNF:
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_2
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨  b^{36, 9}_1
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ -p_288 ∨ -b^{36, 9}_0
c  in DIMACS:
 15695  15696 -15697 -288 -15698 0
 15695  15696 -15697 -288  15699 0
 15695  15696 -15697 -288 -15700 0

c  2+1 --> break 
c    (-b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧  p_288) -> break
c  in CNF:
c     b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 15695 -15696  15697 -288 1162 0


c  2-1 --> 1
c    (-b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧ -p_288) -> (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0)
c  in CNF:
c     b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_2
c     b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_1
c     b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨  b^{36, 9}_0
c  in DIMACS:
 15695 -15696  15697  288 -15698 0
 15695 -15696  15697  288 -15699 0
 15695 -15696  15697  288  15700 0

c  1-1 --> 0
c    (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0 ∧ -p_288) -> (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧ -b^{36, 9}_0)
c  in CNF:
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_2
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_1
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_0
c  in DIMACS:
 15695  15696 -15697  288 -15698 0
 15695  15696 -15697  288 -15699 0
 15695  15696 -15697  288 -15700 0

c  0-1 --> -1
c    (-b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧ -p_288) -> ( b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0)
c  in CNF:
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨  b^{36, 9}_2
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_1
c     b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨  b^{36, 9}_0
c  in DIMACS:
 15695  15696  15697  288  15698 0
 15695  15696  15697  288 -15699 0
 15695  15696  15697  288  15700 0

c  -1-1 --> -2
c    ( b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧  b^{36, 8}_0 ∧ -p_288) -> ( b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0)
c  in CNF:
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨  b^{36, 9}_2
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨  b^{36, 9}_1
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨  p_288 ∨ -b^{36, 9}_0
c  in DIMACS:
-15695  15696 -15697  288  15698 0
-15695  15696 -15697  288  15699 0
-15695  15696 -15697  288 -15700 0

c  -2-1 --> break 
c    ( b^{36, 8}_2 ∧  b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨  b^{36, 8}_0 ∨  p_288 ∨ break
c  in DIMACS:
-15695 -15696  15697  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 8}_2 ∧ -b^{36, 8}_1 ∧ -b^{36, 8}_0 ∧ true) 
c  in CNF:
c    -b^{36, 8}_2 ∨  b^{36, 8}_1 ∨  b^{36, 8}_0 ∨ false 
c  in DIMACS:
-15695  15696  15697  0

c  3 does not represent an automaton state.
c    -(-b^{36, 8}_2 ∧  b^{36, 8}_1 ∧  b^{36, 8}_0 ∧ true) 
c  in CNF:
c     b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ false 
c  in DIMACS:
 15695 -15696 -15697  0
c  -3 does not represent an automaton state.
c    -( b^{36, 8}_2 ∧  b^{36, 8}_1 ∧  b^{36, 8}_0 ∧ true) 
c  in CNF:
c    -b^{36, 8}_2 ∨ -b^{36, 8}_1 ∨ -b^{36, 8}_0 ∨ false 
c  in DIMACS:
-15695 -15696 -15697  0

c i = 9
c  -2+1 --> -1
c    ( b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧  p_324) -> ( b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0)
c  in CNF:
c    -b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨  b^{36, 10}_2
c    -b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_1
c    -b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨  b^{36, 10}_0
c  in DIMACS:
-15698 -15699  15700 -324  15701 0
-15698 -15699  15700 -324 -15702 0
-15698 -15699  15700 -324  15703 0

c  -1+1 --> 0
c    ( b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0 ∧  p_324) -> (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧ -b^{36, 10}_0)
c  in CNF:
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_2
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_1
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_0
c  in DIMACS:
-15698  15699 -15700 -324 -15701 0
-15698  15699 -15700 -324 -15702 0
-15698  15699 -15700 -324 -15703 0

c  0+1 --> 1
c    (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧  p_324) -> (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0)
c  in CNF:
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_2
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_1
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨  b^{36, 10}_0
c  in DIMACS:
 15698  15699  15700 -324 -15701 0
 15698  15699  15700 -324 -15702 0
 15698  15699  15700 -324  15703 0

c  1+1 --> 2
c    (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0 ∧  p_324) -> (-b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0)
c  in CNF:
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_2
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨  b^{36, 10}_1
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ -p_324 ∨ -b^{36, 10}_0
c  in DIMACS:
 15698  15699 -15700 -324 -15701 0
 15698  15699 -15700 -324  15702 0
 15698  15699 -15700 -324 -15703 0

c  2+1 --> break 
c    (-b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧  p_324) -> break
c  in CNF:
c     b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 15698 -15699  15700 -324 1162 0


c  2-1 --> 1
c    (-b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧ -p_324) -> (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0)
c  in CNF:
c     b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_2
c     b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_1
c     b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨  b^{36, 10}_0
c  in DIMACS:
 15698 -15699  15700  324 -15701 0
 15698 -15699  15700  324 -15702 0
 15698 -15699  15700  324  15703 0

c  1-1 --> 0
c    (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0 ∧ -p_324) -> (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧ -b^{36, 10}_0)
c  in CNF:
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_2
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_1
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_0
c  in DIMACS:
 15698  15699 -15700  324 -15701 0
 15698  15699 -15700  324 -15702 0
 15698  15699 -15700  324 -15703 0

c  0-1 --> -1
c    (-b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧ -p_324) -> ( b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0)
c  in CNF:
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨  b^{36, 10}_2
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_1
c     b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨  b^{36, 10}_0
c  in DIMACS:
 15698  15699  15700  324  15701 0
 15698  15699  15700  324 -15702 0
 15698  15699  15700  324  15703 0

c  -1-1 --> -2
c    ( b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧  b^{36, 9}_0 ∧ -p_324) -> ( b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0)
c  in CNF:
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨  b^{36, 10}_2
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨  b^{36, 10}_1
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨  p_324 ∨ -b^{36, 10}_0
c  in DIMACS:
-15698  15699 -15700  324  15701 0
-15698  15699 -15700  324  15702 0
-15698  15699 -15700  324 -15703 0

c  -2-1 --> break 
c    ( b^{36, 9}_2 ∧  b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨  b^{36, 9}_0 ∨  p_324 ∨ break
c  in DIMACS:
-15698 -15699  15700  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 9}_2 ∧ -b^{36, 9}_1 ∧ -b^{36, 9}_0 ∧ true) 
c  in CNF:
c    -b^{36, 9}_2 ∨  b^{36, 9}_1 ∨  b^{36, 9}_0 ∨ false 
c  in DIMACS:
-15698  15699  15700  0

c  3 does not represent an automaton state.
c    -(-b^{36, 9}_2 ∧  b^{36, 9}_1 ∧  b^{36, 9}_0 ∧ true) 
c  in CNF:
c     b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ false 
c  in DIMACS:
 15698 -15699 -15700  0
c  -3 does not represent an automaton state.
c    -( b^{36, 9}_2 ∧  b^{36, 9}_1 ∧  b^{36, 9}_0 ∧ true) 
c  in CNF:
c    -b^{36, 9}_2 ∨ -b^{36, 9}_1 ∨ -b^{36, 9}_0 ∨ false 
c  in DIMACS:
-15698 -15699 -15700  0

c i = 10
c  -2+1 --> -1
c    ( b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧  p_360) -> ( b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0)
c  in CNF:
c    -b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨  b^{36, 11}_2
c    -b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_1
c    -b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨  b^{36, 11}_0
c  in DIMACS:
-15701 -15702  15703 -360  15704 0
-15701 -15702  15703 -360 -15705 0
-15701 -15702  15703 -360  15706 0

c  -1+1 --> 0
c    ( b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0 ∧  p_360) -> (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧ -b^{36, 11}_0)
c  in CNF:
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_2
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_1
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_0
c  in DIMACS:
-15701  15702 -15703 -360 -15704 0
-15701  15702 -15703 -360 -15705 0
-15701  15702 -15703 -360 -15706 0

c  0+1 --> 1
c    (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧  p_360) -> (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0)
c  in CNF:
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_2
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_1
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨  b^{36, 11}_0
c  in DIMACS:
 15701  15702  15703 -360 -15704 0
 15701  15702  15703 -360 -15705 0
 15701  15702  15703 -360  15706 0

c  1+1 --> 2
c    (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0 ∧  p_360) -> (-b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0)
c  in CNF:
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_2
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨  b^{36, 11}_1
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ -p_360 ∨ -b^{36, 11}_0
c  in DIMACS:
 15701  15702 -15703 -360 -15704 0
 15701  15702 -15703 -360  15705 0
 15701  15702 -15703 -360 -15706 0

c  2+1 --> break 
c    (-b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧  p_360) -> break
c  in CNF:
c     b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 15701 -15702  15703 -360 1162 0


c  2-1 --> 1
c    (-b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧ -p_360) -> (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0)
c  in CNF:
c     b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_2
c     b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_1
c     b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨  b^{36, 11}_0
c  in DIMACS:
 15701 -15702  15703  360 -15704 0
 15701 -15702  15703  360 -15705 0
 15701 -15702  15703  360  15706 0

c  1-1 --> 0
c    (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0 ∧ -p_360) -> (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧ -b^{36, 11}_0)
c  in CNF:
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_2
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_1
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_0
c  in DIMACS:
 15701  15702 -15703  360 -15704 0
 15701  15702 -15703  360 -15705 0
 15701  15702 -15703  360 -15706 0

c  0-1 --> -1
c    (-b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧ -p_360) -> ( b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0)
c  in CNF:
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨  b^{36, 11}_2
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_1
c     b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨  b^{36, 11}_0
c  in DIMACS:
 15701  15702  15703  360  15704 0
 15701  15702  15703  360 -15705 0
 15701  15702  15703  360  15706 0

c  -1-1 --> -2
c    ( b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧  b^{36, 10}_0 ∧ -p_360) -> ( b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0)
c  in CNF:
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨  b^{36, 11}_2
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨  b^{36, 11}_1
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨  p_360 ∨ -b^{36, 11}_0
c  in DIMACS:
-15701  15702 -15703  360  15704 0
-15701  15702 -15703  360  15705 0
-15701  15702 -15703  360 -15706 0

c  -2-1 --> break 
c    ( b^{36, 10}_2 ∧  b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨  b^{36, 10}_0 ∨  p_360 ∨ break
c  in DIMACS:
-15701 -15702  15703  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 10}_2 ∧ -b^{36, 10}_1 ∧ -b^{36, 10}_0 ∧ true) 
c  in CNF:
c    -b^{36, 10}_2 ∨  b^{36, 10}_1 ∨  b^{36, 10}_0 ∨ false 
c  in DIMACS:
-15701  15702  15703  0

c  3 does not represent an automaton state.
c    -(-b^{36, 10}_2 ∧  b^{36, 10}_1 ∧  b^{36, 10}_0 ∧ true) 
c  in CNF:
c     b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ false 
c  in DIMACS:
 15701 -15702 -15703  0
c  -3 does not represent an automaton state.
c    -( b^{36, 10}_2 ∧  b^{36, 10}_1 ∧  b^{36, 10}_0 ∧ true) 
c  in CNF:
c    -b^{36, 10}_2 ∨ -b^{36, 10}_1 ∨ -b^{36, 10}_0 ∨ false 
c  in DIMACS:
-15701 -15702 -15703  0

c i = 11
c  -2+1 --> -1
c    ( b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧  p_396) -> ( b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0)
c  in CNF:
c    -b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨  b^{36, 12}_2
c    -b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_1
c    -b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨  b^{36, 12}_0
c  in DIMACS:
-15704 -15705  15706 -396  15707 0
-15704 -15705  15706 -396 -15708 0
-15704 -15705  15706 -396  15709 0

c  -1+1 --> 0
c    ( b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0 ∧  p_396) -> (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧ -b^{36, 12}_0)
c  in CNF:
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_2
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_1
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_0
c  in DIMACS:
-15704  15705 -15706 -396 -15707 0
-15704  15705 -15706 -396 -15708 0
-15704  15705 -15706 -396 -15709 0

c  0+1 --> 1
c    (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧  p_396) -> (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0)
c  in CNF:
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_2
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_1
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨  b^{36, 12}_0
c  in DIMACS:
 15704  15705  15706 -396 -15707 0
 15704  15705  15706 -396 -15708 0
 15704  15705  15706 -396  15709 0

c  1+1 --> 2
c    (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0 ∧  p_396) -> (-b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0)
c  in CNF:
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_2
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨  b^{36, 12}_1
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ -p_396 ∨ -b^{36, 12}_0
c  in DIMACS:
 15704  15705 -15706 -396 -15707 0
 15704  15705 -15706 -396  15708 0
 15704  15705 -15706 -396 -15709 0

c  2+1 --> break 
c    (-b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧  p_396) -> break
c  in CNF:
c     b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 15704 -15705  15706 -396 1162 0


c  2-1 --> 1
c    (-b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧ -p_396) -> (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0)
c  in CNF:
c     b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_2
c     b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_1
c     b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨  b^{36, 12}_0
c  in DIMACS:
 15704 -15705  15706  396 -15707 0
 15704 -15705  15706  396 -15708 0
 15704 -15705  15706  396  15709 0

c  1-1 --> 0
c    (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0 ∧ -p_396) -> (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧ -b^{36, 12}_0)
c  in CNF:
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_2
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_1
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_0
c  in DIMACS:
 15704  15705 -15706  396 -15707 0
 15704  15705 -15706  396 -15708 0
 15704  15705 -15706  396 -15709 0

c  0-1 --> -1
c    (-b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧ -p_396) -> ( b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0)
c  in CNF:
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨  b^{36, 12}_2
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_1
c     b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨  b^{36, 12}_0
c  in DIMACS:
 15704  15705  15706  396  15707 0
 15704  15705  15706  396 -15708 0
 15704  15705  15706  396  15709 0

c  -1-1 --> -2
c    ( b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧  b^{36, 11}_0 ∧ -p_396) -> ( b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0)
c  in CNF:
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨  b^{36, 12}_2
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨  b^{36, 12}_1
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨  p_396 ∨ -b^{36, 12}_0
c  in DIMACS:
-15704  15705 -15706  396  15707 0
-15704  15705 -15706  396  15708 0
-15704  15705 -15706  396 -15709 0

c  -2-1 --> break 
c    ( b^{36, 11}_2 ∧  b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨  b^{36, 11}_0 ∨  p_396 ∨ break
c  in DIMACS:
-15704 -15705  15706  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 11}_2 ∧ -b^{36, 11}_1 ∧ -b^{36, 11}_0 ∧ true) 
c  in CNF:
c    -b^{36, 11}_2 ∨  b^{36, 11}_1 ∨  b^{36, 11}_0 ∨ false 
c  in DIMACS:
-15704  15705  15706  0

c  3 does not represent an automaton state.
c    -(-b^{36, 11}_2 ∧  b^{36, 11}_1 ∧  b^{36, 11}_0 ∧ true) 
c  in CNF:
c     b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ false 
c  in DIMACS:
 15704 -15705 -15706  0
c  -3 does not represent an automaton state.
c    -( b^{36, 11}_2 ∧  b^{36, 11}_1 ∧  b^{36, 11}_0 ∧ true) 
c  in CNF:
c    -b^{36, 11}_2 ∨ -b^{36, 11}_1 ∨ -b^{36, 11}_0 ∨ false 
c  in DIMACS:
-15704 -15705 -15706  0

c i = 12
c  -2+1 --> -1
c    ( b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧  p_432) -> ( b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0)
c  in CNF:
c    -b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨  b^{36, 13}_2
c    -b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_1
c    -b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨  b^{36, 13}_0
c  in DIMACS:
-15707 -15708  15709 -432  15710 0
-15707 -15708  15709 -432 -15711 0
-15707 -15708  15709 -432  15712 0

c  -1+1 --> 0
c    ( b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0 ∧  p_432) -> (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧ -b^{36, 13}_0)
c  in CNF:
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_2
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_1
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_0
c  in DIMACS:
-15707  15708 -15709 -432 -15710 0
-15707  15708 -15709 -432 -15711 0
-15707  15708 -15709 -432 -15712 0

c  0+1 --> 1
c    (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧  p_432) -> (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0)
c  in CNF:
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_2
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_1
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨  b^{36, 13}_0
c  in DIMACS:
 15707  15708  15709 -432 -15710 0
 15707  15708  15709 -432 -15711 0
 15707  15708  15709 -432  15712 0

c  1+1 --> 2
c    (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0 ∧  p_432) -> (-b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0)
c  in CNF:
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_2
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨  b^{36, 13}_1
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ -p_432 ∨ -b^{36, 13}_0
c  in DIMACS:
 15707  15708 -15709 -432 -15710 0
 15707  15708 -15709 -432  15711 0
 15707  15708 -15709 -432 -15712 0

c  2+1 --> break 
c    (-b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧  p_432) -> break
c  in CNF:
c     b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 15707 -15708  15709 -432 1162 0


c  2-1 --> 1
c    (-b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧ -p_432) -> (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0)
c  in CNF:
c     b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_2
c     b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_1
c     b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨  b^{36, 13}_0
c  in DIMACS:
 15707 -15708  15709  432 -15710 0
 15707 -15708  15709  432 -15711 0
 15707 -15708  15709  432  15712 0

c  1-1 --> 0
c    (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0 ∧ -p_432) -> (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧ -b^{36, 13}_0)
c  in CNF:
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_2
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_1
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_0
c  in DIMACS:
 15707  15708 -15709  432 -15710 0
 15707  15708 -15709  432 -15711 0
 15707  15708 -15709  432 -15712 0

c  0-1 --> -1
c    (-b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧ -p_432) -> ( b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0)
c  in CNF:
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨  b^{36, 13}_2
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_1
c     b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨  b^{36, 13}_0
c  in DIMACS:
 15707  15708  15709  432  15710 0
 15707  15708  15709  432 -15711 0
 15707  15708  15709  432  15712 0

c  -1-1 --> -2
c    ( b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧  b^{36, 12}_0 ∧ -p_432) -> ( b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0)
c  in CNF:
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨  b^{36, 13}_2
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨  b^{36, 13}_1
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨  p_432 ∨ -b^{36, 13}_0
c  in DIMACS:
-15707  15708 -15709  432  15710 0
-15707  15708 -15709  432  15711 0
-15707  15708 -15709  432 -15712 0

c  -2-1 --> break 
c    ( b^{36, 12}_2 ∧  b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨  b^{36, 12}_0 ∨  p_432 ∨ break
c  in DIMACS:
-15707 -15708  15709  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 12}_2 ∧ -b^{36, 12}_1 ∧ -b^{36, 12}_0 ∧ true) 
c  in CNF:
c    -b^{36, 12}_2 ∨  b^{36, 12}_1 ∨  b^{36, 12}_0 ∨ false 
c  in DIMACS:
-15707  15708  15709  0

c  3 does not represent an automaton state.
c    -(-b^{36, 12}_2 ∧  b^{36, 12}_1 ∧  b^{36, 12}_0 ∧ true) 
c  in CNF:
c     b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ false 
c  in DIMACS:
 15707 -15708 -15709  0
c  -3 does not represent an automaton state.
c    -( b^{36, 12}_2 ∧  b^{36, 12}_1 ∧  b^{36, 12}_0 ∧ true) 
c  in CNF:
c    -b^{36, 12}_2 ∨ -b^{36, 12}_1 ∨ -b^{36, 12}_0 ∨ false 
c  in DIMACS:
-15707 -15708 -15709  0

c i = 13
c  -2+1 --> -1
c    ( b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧  p_468) -> ( b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0)
c  in CNF:
c    -b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨  b^{36, 14}_2
c    -b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_1
c    -b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨  b^{36, 14}_0
c  in DIMACS:
-15710 -15711  15712 -468  15713 0
-15710 -15711  15712 -468 -15714 0
-15710 -15711  15712 -468  15715 0

c  -1+1 --> 0
c    ( b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0 ∧  p_468) -> (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧ -b^{36, 14}_0)
c  in CNF:
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_2
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_1
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_0
c  in DIMACS:
-15710  15711 -15712 -468 -15713 0
-15710  15711 -15712 -468 -15714 0
-15710  15711 -15712 -468 -15715 0

c  0+1 --> 1
c    (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧  p_468) -> (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0)
c  in CNF:
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_2
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_1
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨  b^{36, 14}_0
c  in DIMACS:
 15710  15711  15712 -468 -15713 0
 15710  15711  15712 -468 -15714 0
 15710  15711  15712 -468  15715 0

c  1+1 --> 2
c    (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0 ∧  p_468) -> (-b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0)
c  in CNF:
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_2
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨  b^{36, 14}_1
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ -p_468 ∨ -b^{36, 14}_0
c  in DIMACS:
 15710  15711 -15712 -468 -15713 0
 15710  15711 -15712 -468  15714 0
 15710  15711 -15712 -468 -15715 0

c  2+1 --> break 
c    (-b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧  p_468) -> break
c  in CNF:
c     b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 15710 -15711  15712 -468 1162 0


c  2-1 --> 1
c    (-b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧ -p_468) -> (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0)
c  in CNF:
c     b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_2
c     b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_1
c     b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨  b^{36, 14}_0
c  in DIMACS:
 15710 -15711  15712  468 -15713 0
 15710 -15711  15712  468 -15714 0
 15710 -15711  15712  468  15715 0

c  1-1 --> 0
c    (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0 ∧ -p_468) -> (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧ -b^{36, 14}_0)
c  in CNF:
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_2
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_1
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_0
c  in DIMACS:
 15710  15711 -15712  468 -15713 0
 15710  15711 -15712  468 -15714 0
 15710  15711 -15712  468 -15715 0

c  0-1 --> -1
c    (-b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧ -p_468) -> ( b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0)
c  in CNF:
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨  b^{36, 14}_2
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_1
c     b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨  b^{36, 14}_0
c  in DIMACS:
 15710  15711  15712  468  15713 0
 15710  15711  15712  468 -15714 0
 15710  15711  15712  468  15715 0

c  -1-1 --> -2
c    ( b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧  b^{36, 13}_0 ∧ -p_468) -> ( b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0)
c  in CNF:
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨  b^{36, 14}_2
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨  b^{36, 14}_1
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨  p_468 ∨ -b^{36, 14}_0
c  in DIMACS:
-15710  15711 -15712  468  15713 0
-15710  15711 -15712  468  15714 0
-15710  15711 -15712  468 -15715 0

c  -2-1 --> break 
c    ( b^{36, 13}_2 ∧  b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨  b^{36, 13}_0 ∨  p_468 ∨ break
c  in DIMACS:
-15710 -15711  15712  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 13}_2 ∧ -b^{36, 13}_1 ∧ -b^{36, 13}_0 ∧ true) 
c  in CNF:
c    -b^{36, 13}_2 ∨  b^{36, 13}_1 ∨  b^{36, 13}_0 ∨ false 
c  in DIMACS:
-15710  15711  15712  0

c  3 does not represent an automaton state.
c    -(-b^{36, 13}_2 ∧  b^{36, 13}_1 ∧  b^{36, 13}_0 ∧ true) 
c  in CNF:
c     b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ false 
c  in DIMACS:
 15710 -15711 -15712  0
c  -3 does not represent an automaton state.
c    -( b^{36, 13}_2 ∧  b^{36, 13}_1 ∧  b^{36, 13}_0 ∧ true) 
c  in CNF:
c    -b^{36, 13}_2 ∨ -b^{36, 13}_1 ∨ -b^{36, 13}_0 ∨ false 
c  in DIMACS:
-15710 -15711 -15712  0

c i = 14
c  -2+1 --> -1
c    ( b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧  p_504) -> ( b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0)
c  in CNF:
c    -b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨  b^{36, 15}_2
c    -b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_1
c    -b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨  b^{36, 15}_0
c  in DIMACS:
-15713 -15714  15715 -504  15716 0
-15713 -15714  15715 -504 -15717 0
-15713 -15714  15715 -504  15718 0

c  -1+1 --> 0
c    ( b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0 ∧  p_504) -> (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧ -b^{36, 15}_0)
c  in CNF:
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_2
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_1
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_0
c  in DIMACS:
-15713  15714 -15715 -504 -15716 0
-15713  15714 -15715 -504 -15717 0
-15713  15714 -15715 -504 -15718 0

c  0+1 --> 1
c    (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧  p_504) -> (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0)
c  in CNF:
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_2
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_1
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨  b^{36, 15}_0
c  in DIMACS:
 15713  15714  15715 -504 -15716 0
 15713  15714  15715 -504 -15717 0
 15713  15714  15715 -504  15718 0

c  1+1 --> 2
c    (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0 ∧  p_504) -> (-b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0)
c  in CNF:
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_2
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨  b^{36, 15}_1
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ -p_504 ∨ -b^{36, 15}_0
c  in DIMACS:
 15713  15714 -15715 -504 -15716 0
 15713  15714 -15715 -504  15717 0
 15713  15714 -15715 -504 -15718 0

c  2+1 --> break 
c    (-b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧  p_504) -> break
c  in CNF:
c     b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 15713 -15714  15715 -504 1162 0


c  2-1 --> 1
c    (-b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧ -p_504) -> (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0)
c  in CNF:
c     b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_2
c     b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_1
c     b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨  b^{36, 15}_0
c  in DIMACS:
 15713 -15714  15715  504 -15716 0
 15713 -15714  15715  504 -15717 0
 15713 -15714  15715  504  15718 0

c  1-1 --> 0
c    (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0 ∧ -p_504) -> (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧ -b^{36, 15}_0)
c  in CNF:
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_2
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_1
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_0
c  in DIMACS:
 15713  15714 -15715  504 -15716 0
 15713  15714 -15715  504 -15717 0
 15713  15714 -15715  504 -15718 0

c  0-1 --> -1
c    (-b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧ -p_504) -> ( b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0)
c  in CNF:
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨  b^{36, 15}_2
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_1
c     b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨  b^{36, 15}_0
c  in DIMACS:
 15713  15714  15715  504  15716 0
 15713  15714  15715  504 -15717 0
 15713  15714  15715  504  15718 0

c  -1-1 --> -2
c    ( b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧  b^{36, 14}_0 ∧ -p_504) -> ( b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0)
c  in CNF:
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨  b^{36, 15}_2
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨  b^{36, 15}_1
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨  p_504 ∨ -b^{36, 15}_0
c  in DIMACS:
-15713  15714 -15715  504  15716 0
-15713  15714 -15715  504  15717 0
-15713  15714 -15715  504 -15718 0

c  -2-1 --> break 
c    ( b^{36, 14}_2 ∧  b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨  b^{36, 14}_0 ∨  p_504 ∨ break
c  in DIMACS:
-15713 -15714  15715  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 14}_2 ∧ -b^{36, 14}_1 ∧ -b^{36, 14}_0 ∧ true) 
c  in CNF:
c    -b^{36, 14}_2 ∨  b^{36, 14}_1 ∨  b^{36, 14}_0 ∨ false 
c  in DIMACS:
-15713  15714  15715  0

c  3 does not represent an automaton state.
c    -(-b^{36, 14}_2 ∧  b^{36, 14}_1 ∧  b^{36, 14}_0 ∧ true) 
c  in CNF:
c     b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ false 
c  in DIMACS:
 15713 -15714 -15715  0
c  -3 does not represent an automaton state.
c    -( b^{36, 14}_2 ∧  b^{36, 14}_1 ∧  b^{36, 14}_0 ∧ true) 
c  in CNF:
c    -b^{36, 14}_2 ∨ -b^{36, 14}_1 ∨ -b^{36, 14}_0 ∨ false 
c  in DIMACS:
-15713 -15714 -15715  0

c i = 15
c  -2+1 --> -1
c    ( b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧  p_540) -> ( b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0)
c  in CNF:
c    -b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨  b^{36, 16}_2
c    -b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_1
c    -b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨  b^{36, 16}_0
c  in DIMACS:
-15716 -15717  15718 -540  15719 0
-15716 -15717  15718 -540 -15720 0
-15716 -15717  15718 -540  15721 0

c  -1+1 --> 0
c    ( b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0 ∧  p_540) -> (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧ -b^{36, 16}_0)
c  in CNF:
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_2
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_1
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_0
c  in DIMACS:
-15716  15717 -15718 -540 -15719 0
-15716  15717 -15718 -540 -15720 0
-15716  15717 -15718 -540 -15721 0

c  0+1 --> 1
c    (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧  p_540) -> (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0)
c  in CNF:
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_2
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_1
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨  b^{36, 16}_0
c  in DIMACS:
 15716  15717  15718 -540 -15719 0
 15716  15717  15718 -540 -15720 0
 15716  15717  15718 -540  15721 0

c  1+1 --> 2
c    (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0 ∧  p_540) -> (-b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0)
c  in CNF:
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_2
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨  b^{36, 16}_1
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ -p_540 ∨ -b^{36, 16}_0
c  in DIMACS:
 15716  15717 -15718 -540 -15719 0
 15716  15717 -15718 -540  15720 0
 15716  15717 -15718 -540 -15721 0

c  2+1 --> break 
c    (-b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧  p_540) -> break
c  in CNF:
c     b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 15716 -15717  15718 -540 1162 0


c  2-1 --> 1
c    (-b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧ -p_540) -> (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0)
c  in CNF:
c     b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_2
c     b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_1
c     b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨  b^{36, 16}_0
c  in DIMACS:
 15716 -15717  15718  540 -15719 0
 15716 -15717  15718  540 -15720 0
 15716 -15717  15718  540  15721 0

c  1-1 --> 0
c    (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0 ∧ -p_540) -> (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧ -b^{36, 16}_0)
c  in CNF:
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_2
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_1
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_0
c  in DIMACS:
 15716  15717 -15718  540 -15719 0
 15716  15717 -15718  540 -15720 0
 15716  15717 -15718  540 -15721 0

c  0-1 --> -1
c    (-b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧ -p_540) -> ( b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0)
c  in CNF:
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨  b^{36, 16}_2
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_1
c     b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨  b^{36, 16}_0
c  in DIMACS:
 15716  15717  15718  540  15719 0
 15716  15717  15718  540 -15720 0
 15716  15717  15718  540  15721 0

c  -1-1 --> -2
c    ( b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧  b^{36, 15}_0 ∧ -p_540) -> ( b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0)
c  in CNF:
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨  b^{36, 16}_2
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨  b^{36, 16}_1
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨  p_540 ∨ -b^{36, 16}_0
c  in DIMACS:
-15716  15717 -15718  540  15719 0
-15716  15717 -15718  540  15720 0
-15716  15717 -15718  540 -15721 0

c  -2-1 --> break 
c    ( b^{36, 15}_2 ∧  b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨  b^{36, 15}_0 ∨  p_540 ∨ break
c  in DIMACS:
-15716 -15717  15718  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 15}_2 ∧ -b^{36, 15}_1 ∧ -b^{36, 15}_0 ∧ true) 
c  in CNF:
c    -b^{36, 15}_2 ∨  b^{36, 15}_1 ∨  b^{36, 15}_0 ∨ false 
c  in DIMACS:
-15716  15717  15718  0

c  3 does not represent an automaton state.
c    -(-b^{36, 15}_2 ∧  b^{36, 15}_1 ∧  b^{36, 15}_0 ∧ true) 
c  in CNF:
c     b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ false 
c  in DIMACS:
 15716 -15717 -15718  0
c  -3 does not represent an automaton state.
c    -( b^{36, 15}_2 ∧  b^{36, 15}_1 ∧  b^{36, 15}_0 ∧ true) 
c  in CNF:
c    -b^{36, 15}_2 ∨ -b^{36, 15}_1 ∨ -b^{36, 15}_0 ∨ false 
c  in DIMACS:
-15716 -15717 -15718  0

c i = 16
c  -2+1 --> -1
c    ( b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧  p_576) -> ( b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0)
c  in CNF:
c    -b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨  b^{36, 17}_2
c    -b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_1
c    -b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨  b^{36, 17}_0
c  in DIMACS:
-15719 -15720  15721 -576  15722 0
-15719 -15720  15721 -576 -15723 0
-15719 -15720  15721 -576  15724 0

c  -1+1 --> 0
c    ( b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0 ∧  p_576) -> (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧ -b^{36, 17}_0)
c  in CNF:
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_2
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_1
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_0
c  in DIMACS:
-15719  15720 -15721 -576 -15722 0
-15719  15720 -15721 -576 -15723 0
-15719  15720 -15721 -576 -15724 0

c  0+1 --> 1
c    (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧  p_576) -> (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0)
c  in CNF:
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_2
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_1
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨  b^{36, 17}_0
c  in DIMACS:
 15719  15720  15721 -576 -15722 0
 15719  15720  15721 -576 -15723 0
 15719  15720  15721 -576  15724 0

c  1+1 --> 2
c    (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0 ∧  p_576) -> (-b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0)
c  in CNF:
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_2
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨  b^{36, 17}_1
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ -p_576 ∨ -b^{36, 17}_0
c  in DIMACS:
 15719  15720 -15721 -576 -15722 0
 15719  15720 -15721 -576  15723 0
 15719  15720 -15721 -576 -15724 0

c  2+1 --> break 
c    (-b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧  p_576) -> break
c  in CNF:
c     b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 15719 -15720  15721 -576 1162 0


c  2-1 --> 1
c    (-b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧ -p_576) -> (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0)
c  in CNF:
c     b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_2
c     b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_1
c     b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨  b^{36, 17}_0
c  in DIMACS:
 15719 -15720  15721  576 -15722 0
 15719 -15720  15721  576 -15723 0
 15719 -15720  15721  576  15724 0

c  1-1 --> 0
c    (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0 ∧ -p_576) -> (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧ -b^{36, 17}_0)
c  in CNF:
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_2
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_1
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_0
c  in DIMACS:
 15719  15720 -15721  576 -15722 0
 15719  15720 -15721  576 -15723 0
 15719  15720 -15721  576 -15724 0

c  0-1 --> -1
c    (-b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧ -p_576) -> ( b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0)
c  in CNF:
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨  b^{36, 17}_2
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_1
c     b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨  b^{36, 17}_0
c  in DIMACS:
 15719  15720  15721  576  15722 0
 15719  15720  15721  576 -15723 0
 15719  15720  15721  576  15724 0

c  -1-1 --> -2
c    ( b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧  b^{36, 16}_0 ∧ -p_576) -> ( b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0)
c  in CNF:
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨  b^{36, 17}_2
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨  b^{36, 17}_1
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨  p_576 ∨ -b^{36, 17}_0
c  in DIMACS:
-15719  15720 -15721  576  15722 0
-15719  15720 -15721  576  15723 0
-15719  15720 -15721  576 -15724 0

c  -2-1 --> break 
c    ( b^{36, 16}_2 ∧  b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨  b^{36, 16}_0 ∨  p_576 ∨ break
c  in DIMACS:
-15719 -15720  15721  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 16}_2 ∧ -b^{36, 16}_1 ∧ -b^{36, 16}_0 ∧ true) 
c  in CNF:
c    -b^{36, 16}_2 ∨  b^{36, 16}_1 ∨  b^{36, 16}_0 ∨ false 
c  in DIMACS:
-15719  15720  15721  0

c  3 does not represent an automaton state.
c    -(-b^{36, 16}_2 ∧  b^{36, 16}_1 ∧  b^{36, 16}_0 ∧ true) 
c  in CNF:
c     b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ false 
c  in DIMACS:
 15719 -15720 -15721  0
c  -3 does not represent an automaton state.
c    -( b^{36, 16}_2 ∧  b^{36, 16}_1 ∧  b^{36, 16}_0 ∧ true) 
c  in CNF:
c    -b^{36, 16}_2 ∨ -b^{36, 16}_1 ∨ -b^{36, 16}_0 ∨ false 
c  in DIMACS:
-15719 -15720 -15721  0

c i = 17
c  -2+1 --> -1
c    ( b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧  p_612) -> ( b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0)
c  in CNF:
c    -b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨  b^{36, 18}_2
c    -b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_1
c    -b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨  b^{36, 18}_0
c  in DIMACS:
-15722 -15723  15724 -612  15725 0
-15722 -15723  15724 -612 -15726 0
-15722 -15723  15724 -612  15727 0

c  -1+1 --> 0
c    ( b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0 ∧  p_612) -> (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧ -b^{36, 18}_0)
c  in CNF:
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_2
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_1
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_0
c  in DIMACS:
-15722  15723 -15724 -612 -15725 0
-15722  15723 -15724 -612 -15726 0
-15722  15723 -15724 -612 -15727 0

c  0+1 --> 1
c    (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧  p_612) -> (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0)
c  in CNF:
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_2
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_1
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨  b^{36, 18}_0
c  in DIMACS:
 15722  15723  15724 -612 -15725 0
 15722  15723  15724 -612 -15726 0
 15722  15723  15724 -612  15727 0

c  1+1 --> 2
c    (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0 ∧  p_612) -> (-b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0)
c  in CNF:
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_2
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨  b^{36, 18}_1
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ -p_612 ∨ -b^{36, 18}_0
c  in DIMACS:
 15722  15723 -15724 -612 -15725 0
 15722  15723 -15724 -612  15726 0
 15722  15723 -15724 -612 -15727 0

c  2+1 --> break 
c    (-b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧  p_612) -> break
c  in CNF:
c     b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 15722 -15723  15724 -612 1162 0


c  2-1 --> 1
c    (-b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧ -p_612) -> (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0)
c  in CNF:
c     b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_2
c     b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_1
c     b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨  b^{36, 18}_0
c  in DIMACS:
 15722 -15723  15724  612 -15725 0
 15722 -15723  15724  612 -15726 0
 15722 -15723  15724  612  15727 0

c  1-1 --> 0
c    (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0 ∧ -p_612) -> (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧ -b^{36, 18}_0)
c  in CNF:
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_2
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_1
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_0
c  in DIMACS:
 15722  15723 -15724  612 -15725 0
 15722  15723 -15724  612 -15726 0
 15722  15723 -15724  612 -15727 0

c  0-1 --> -1
c    (-b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧ -p_612) -> ( b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0)
c  in CNF:
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨  b^{36, 18}_2
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_1
c     b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨  b^{36, 18}_0
c  in DIMACS:
 15722  15723  15724  612  15725 0
 15722  15723  15724  612 -15726 0
 15722  15723  15724  612  15727 0

c  -1-1 --> -2
c    ( b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧  b^{36, 17}_0 ∧ -p_612) -> ( b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0)
c  in CNF:
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨  b^{36, 18}_2
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨  b^{36, 18}_1
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨  p_612 ∨ -b^{36, 18}_0
c  in DIMACS:
-15722  15723 -15724  612  15725 0
-15722  15723 -15724  612  15726 0
-15722  15723 -15724  612 -15727 0

c  -2-1 --> break 
c    ( b^{36, 17}_2 ∧  b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨  b^{36, 17}_0 ∨  p_612 ∨ break
c  in DIMACS:
-15722 -15723  15724  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 17}_2 ∧ -b^{36, 17}_1 ∧ -b^{36, 17}_0 ∧ true) 
c  in CNF:
c    -b^{36, 17}_2 ∨  b^{36, 17}_1 ∨  b^{36, 17}_0 ∨ false 
c  in DIMACS:
-15722  15723  15724  0

c  3 does not represent an automaton state.
c    -(-b^{36, 17}_2 ∧  b^{36, 17}_1 ∧  b^{36, 17}_0 ∧ true) 
c  in CNF:
c     b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ false 
c  in DIMACS:
 15722 -15723 -15724  0
c  -3 does not represent an automaton state.
c    -( b^{36, 17}_2 ∧  b^{36, 17}_1 ∧  b^{36, 17}_0 ∧ true) 
c  in CNF:
c    -b^{36, 17}_2 ∨ -b^{36, 17}_1 ∨ -b^{36, 17}_0 ∨ false 
c  in DIMACS:
-15722 -15723 -15724  0

c i = 18
c  -2+1 --> -1
c    ( b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧  p_648) -> ( b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0)
c  in CNF:
c    -b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨  b^{36, 19}_2
c    -b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_1
c    -b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨  b^{36, 19}_0
c  in DIMACS:
-15725 -15726  15727 -648  15728 0
-15725 -15726  15727 -648 -15729 0
-15725 -15726  15727 -648  15730 0

c  -1+1 --> 0
c    ( b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0 ∧  p_648) -> (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧ -b^{36, 19}_0)
c  in CNF:
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_2
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_1
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_0
c  in DIMACS:
-15725  15726 -15727 -648 -15728 0
-15725  15726 -15727 -648 -15729 0
-15725  15726 -15727 -648 -15730 0

c  0+1 --> 1
c    (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧  p_648) -> (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0)
c  in CNF:
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_2
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_1
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨  b^{36, 19}_0
c  in DIMACS:
 15725  15726  15727 -648 -15728 0
 15725  15726  15727 -648 -15729 0
 15725  15726  15727 -648  15730 0

c  1+1 --> 2
c    (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0 ∧  p_648) -> (-b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0)
c  in CNF:
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_2
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨  b^{36, 19}_1
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ -p_648 ∨ -b^{36, 19}_0
c  in DIMACS:
 15725  15726 -15727 -648 -15728 0
 15725  15726 -15727 -648  15729 0
 15725  15726 -15727 -648 -15730 0

c  2+1 --> break 
c    (-b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧  p_648) -> break
c  in CNF:
c     b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 15725 -15726  15727 -648 1162 0


c  2-1 --> 1
c    (-b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧ -p_648) -> (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0)
c  in CNF:
c     b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_2
c     b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_1
c     b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨  b^{36, 19}_0
c  in DIMACS:
 15725 -15726  15727  648 -15728 0
 15725 -15726  15727  648 -15729 0
 15725 -15726  15727  648  15730 0

c  1-1 --> 0
c    (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0 ∧ -p_648) -> (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧ -b^{36, 19}_0)
c  in CNF:
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_2
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_1
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_0
c  in DIMACS:
 15725  15726 -15727  648 -15728 0
 15725  15726 -15727  648 -15729 0
 15725  15726 -15727  648 -15730 0

c  0-1 --> -1
c    (-b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧ -p_648) -> ( b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0)
c  in CNF:
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨  b^{36, 19}_2
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_1
c     b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨  b^{36, 19}_0
c  in DIMACS:
 15725  15726  15727  648  15728 0
 15725  15726  15727  648 -15729 0
 15725  15726  15727  648  15730 0

c  -1-1 --> -2
c    ( b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧  b^{36, 18}_0 ∧ -p_648) -> ( b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0)
c  in CNF:
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨  b^{36, 19}_2
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨  b^{36, 19}_1
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨  p_648 ∨ -b^{36, 19}_0
c  in DIMACS:
-15725  15726 -15727  648  15728 0
-15725  15726 -15727  648  15729 0
-15725  15726 -15727  648 -15730 0

c  -2-1 --> break 
c    ( b^{36, 18}_2 ∧  b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨  b^{36, 18}_0 ∨  p_648 ∨ break
c  in DIMACS:
-15725 -15726  15727  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 18}_2 ∧ -b^{36, 18}_1 ∧ -b^{36, 18}_0 ∧ true) 
c  in CNF:
c    -b^{36, 18}_2 ∨  b^{36, 18}_1 ∨  b^{36, 18}_0 ∨ false 
c  in DIMACS:
-15725  15726  15727  0

c  3 does not represent an automaton state.
c    -(-b^{36, 18}_2 ∧  b^{36, 18}_1 ∧  b^{36, 18}_0 ∧ true) 
c  in CNF:
c     b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ false 
c  in DIMACS:
 15725 -15726 -15727  0
c  -3 does not represent an automaton state.
c    -( b^{36, 18}_2 ∧  b^{36, 18}_1 ∧  b^{36, 18}_0 ∧ true) 
c  in CNF:
c    -b^{36, 18}_2 ∨ -b^{36, 18}_1 ∨ -b^{36, 18}_0 ∨ false 
c  in DIMACS:
-15725 -15726 -15727  0

c i = 19
c  -2+1 --> -1
c    ( b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧  p_684) -> ( b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0)
c  in CNF:
c    -b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨  b^{36, 20}_2
c    -b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_1
c    -b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨  b^{36, 20}_0
c  in DIMACS:
-15728 -15729  15730 -684  15731 0
-15728 -15729  15730 -684 -15732 0
-15728 -15729  15730 -684  15733 0

c  -1+1 --> 0
c    ( b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0 ∧  p_684) -> (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧ -b^{36, 20}_0)
c  in CNF:
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_2
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_1
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_0
c  in DIMACS:
-15728  15729 -15730 -684 -15731 0
-15728  15729 -15730 -684 -15732 0
-15728  15729 -15730 -684 -15733 0

c  0+1 --> 1
c    (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧  p_684) -> (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0)
c  in CNF:
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_2
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_1
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨  b^{36, 20}_0
c  in DIMACS:
 15728  15729  15730 -684 -15731 0
 15728  15729  15730 -684 -15732 0
 15728  15729  15730 -684  15733 0

c  1+1 --> 2
c    (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0 ∧  p_684) -> (-b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0)
c  in CNF:
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_2
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨  b^{36, 20}_1
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ -p_684 ∨ -b^{36, 20}_0
c  in DIMACS:
 15728  15729 -15730 -684 -15731 0
 15728  15729 -15730 -684  15732 0
 15728  15729 -15730 -684 -15733 0

c  2+1 --> break 
c    (-b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧  p_684) -> break
c  in CNF:
c     b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 15728 -15729  15730 -684 1162 0


c  2-1 --> 1
c    (-b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧ -p_684) -> (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0)
c  in CNF:
c     b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_2
c     b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_1
c     b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨  b^{36, 20}_0
c  in DIMACS:
 15728 -15729  15730  684 -15731 0
 15728 -15729  15730  684 -15732 0
 15728 -15729  15730  684  15733 0

c  1-1 --> 0
c    (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0 ∧ -p_684) -> (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧ -b^{36, 20}_0)
c  in CNF:
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_2
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_1
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_0
c  in DIMACS:
 15728  15729 -15730  684 -15731 0
 15728  15729 -15730  684 -15732 0
 15728  15729 -15730  684 -15733 0

c  0-1 --> -1
c    (-b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧ -p_684) -> ( b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0)
c  in CNF:
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨  b^{36, 20}_2
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_1
c     b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨  b^{36, 20}_0
c  in DIMACS:
 15728  15729  15730  684  15731 0
 15728  15729  15730  684 -15732 0
 15728  15729  15730  684  15733 0

c  -1-1 --> -2
c    ( b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧  b^{36, 19}_0 ∧ -p_684) -> ( b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0)
c  in CNF:
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨  b^{36, 20}_2
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨  b^{36, 20}_1
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨  p_684 ∨ -b^{36, 20}_0
c  in DIMACS:
-15728  15729 -15730  684  15731 0
-15728  15729 -15730  684  15732 0
-15728  15729 -15730  684 -15733 0

c  -2-1 --> break 
c    ( b^{36, 19}_2 ∧  b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨  b^{36, 19}_0 ∨  p_684 ∨ break
c  in DIMACS:
-15728 -15729  15730  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 19}_2 ∧ -b^{36, 19}_1 ∧ -b^{36, 19}_0 ∧ true) 
c  in CNF:
c    -b^{36, 19}_2 ∨  b^{36, 19}_1 ∨  b^{36, 19}_0 ∨ false 
c  in DIMACS:
-15728  15729  15730  0

c  3 does not represent an automaton state.
c    -(-b^{36, 19}_2 ∧  b^{36, 19}_1 ∧  b^{36, 19}_0 ∧ true) 
c  in CNF:
c     b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ false 
c  in DIMACS:
 15728 -15729 -15730  0
c  -3 does not represent an automaton state.
c    -( b^{36, 19}_2 ∧  b^{36, 19}_1 ∧  b^{36, 19}_0 ∧ true) 
c  in CNF:
c    -b^{36, 19}_2 ∨ -b^{36, 19}_1 ∨ -b^{36, 19}_0 ∨ false 
c  in DIMACS:
-15728 -15729 -15730  0

c i = 20
c  -2+1 --> -1
c    ( b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧  p_720) -> ( b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0)
c  in CNF:
c    -b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨  b^{36, 21}_2
c    -b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_1
c    -b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨  b^{36, 21}_0
c  in DIMACS:
-15731 -15732  15733 -720  15734 0
-15731 -15732  15733 -720 -15735 0
-15731 -15732  15733 -720  15736 0

c  -1+1 --> 0
c    ( b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0 ∧  p_720) -> (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧ -b^{36, 21}_0)
c  in CNF:
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_2
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_1
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_0
c  in DIMACS:
-15731  15732 -15733 -720 -15734 0
-15731  15732 -15733 -720 -15735 0
-15731  15732 -15733 -720 -15736 0

c  0+1 --> 1
c    (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧  p_720) -> (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0)
c  in CNF:
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_2
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_1
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨  b^{36, 21}_0
c  in DIMACS:
 15731  15732  15733 -720 -15734 0
 15731  15732  15733 -720 -15735 0
 15731  15732  15733 -720  15736 0

c  1+1 --> 2
c    (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0 ∧  p_720) -> (-b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0)
c  in CNF:
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_2
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨  b^{36, 21}_1
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ -p_720 ∨ -b^{36, 21}_0
c  in DIMACS:
 15731  15732 -15733 -720 -15734 0
 15731  15732 -15733 -720  15735 0
 15731  15732 -15733 -720 -15736 0

c  2+1 --> break 
c    (-b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧  p_720) -> break
c  in CNF:
c     b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 15731 -15732  15733 -720 1162 0


c  2-1 --> 1
c    (-b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧ -p_720) -> (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0)
c  in CNF:
c     b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_2
c     b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_1
c     b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨  b^{36, 21}_0
c  in DIMACS:
 15731 -15732  15733  720 -15734 0
 15731 -15732  15733  720 -15735 0
 15731 -15732  15733  720  15736 0

c  1-1 --> 0
c    (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0 ∧ -p_720) -> (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧ -b^{36, 21}_0)
c  in CNF:
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_2
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_1
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_0
c  in DIMACS:
 15731  15732 -15733  720 -15734 0
 15731  15732 -15733  720 -15735 0
 15731  15732 -15733  720 -15736 0

c  0-1 --> -1
c    (-b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧ -p_720) -> ( b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0)
c  in CNF:
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨  b^{36, 21}_2
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_1
c     b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨  b^{36, 21}_0
c  in DIMACS:
 15731  15732  15733  720  15734 0
 15731  15732  15733  720 -15735 0
 15731  15732  15733  720  15736 0

c  -1-1 --> -2
c    ( b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧  b^{36, 20}_0 ∧ -p_720) -> ( b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0)
c  in CNF:
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨  b^{36, 21}_2
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨  b^{36, 21}_1
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨  p_720 ∨ -b^{36, 21}_0
c  in DIMACS:
-15731  15732 -15733  720  15734 0
-15731  15732 -15733  720  15735 0
-15731  15732 -15733  720 -15736 0

c  -2-1 --> break 
c    ( b^{36, 20}_2 ∧  b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨  b^{36, 20}_0 ∨  p_720 ∨ break
c  in DIMACS:
-15731 -15732  15733  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 20}_2 ∧ -b^{36, 20}_1 ∧ -b^{36, 20}_0 ∧ true) 
c  in CNF:
c    -b^{36, 20}_2 ∨  b^{36, 20}_1 ∨  b^{36, 20}_0 ∨ false 
c  in DIMACS:
-15731  15732  15733  0

c  3 does not represent an automaton state.
c    -(-b^{36, 20}_2 ∧  b^{36, 20}_1 ∧  b^{36, 20}_0 ∧ true) 
c  in CNF:
c     b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ false 
c  in DIMACS:
 15731 -15732 -15733  0
c  -3 does not represent an automaton state.
c    -( b^{36, 20}_2 ∧  b^{36, 20}_1 ∧  b^{36, 20}_0 ∧ true) 
c  in CNF:
c    -b^{36, 20}_2 ∨ -b^{36, 20}_1 ∨ -b^{36, 20}_0 ∨ false 
c  in DIMACS:
-15731 -15732 -15733  0

c i = 21
c  -2+1 --> -1
c    ( b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧  p_756) -> ( b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0)
c  in CNF:
c    -b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨  b^{36, 22}_2
c    -b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_1
c    -b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨  b^{36, 22}_0
c  in DIMACS:
-15734 -15735  15736 -756  15737 0
-15734 -15735  15736 -756 -15738 0
-15734 -15735  15736 -756  15739 0

c  -1+1 --> 0
c    ( b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0 ∧  p_756) -> (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧ -b^{36, 22}_0)
c  in CNF:
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_2
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_1
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_0
c  in DIMACS:
-15734  15735 -15736 -756 -15737 0
-15734  15735 -15736 -756 -15738 0
-15734  15735 -15736 -756 -15739 0

c  0+1 --> 1
c    (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧  p_756) -> (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0)
c  in CNF:
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_2
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_1
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨  b^{36, 22}_0
c  in DIMACS:
 15734  15735  15736 -756 -15737 0
 15734  15735  15736 -756 -15738 0
 15734  15735  15736 -756  15739 0

c  1+1 --> 2
c    (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0 ∧  p_756) -> (-b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0)
c  in CNF:
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_2
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨  b^{36, 22}_1
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ -p_756 ∨ -b^{36, 22}_0
c  in DIMACS:
 15734  15735 -15736 -756 -15737 0
 15734  15735 -15736 -756  15738 0
 15734  15735 -15736 -756 -15739 0

c  2+1 --> break 
c    (-b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧  p_756) -> break
c  in CNF:
c     b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 15734 -15735  15736 -756 1162 0


c  2-1 --> 1
c    (-b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧ -p_756) -> (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0)
c  in CNF:
c     b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_2
c     b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_1
c     b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨  b^{36, 22}_0
c  in DIMACS:
 15734 -15735  15736  756 -15737 0
 15734 -15735  15736  756 -15738 0
 15734 -15735  15736  756  15739 0

c  1-1 --> 0
c    (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0 ∧ -p_756) -> (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧ -b^{36, 22}_0)
c  in CNF:
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_2
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_1
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_0
c  in DIMACS:
 15734  15735 -15736  756 -15737 0
 15734  15735 -15736  756 -15738 0
 15734  15735 -15736  756 -15739 0

c  0-1 --> -1
c    (-b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧ -p_756) -> ( b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0)
c  in CNF:
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨  b^{36, 22}_2
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_1
c     b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨  b^{36, 22}_0
c  in DIMACS:
 15734  15735  15736  756  15737 0
 15734  15735  15736  756 -15738 0
 15734  15735  15736  756  15739 0

c  -1-1 --> -2
c    ( b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧  b^{36, 21}_0 ∧ -p_756) -> ( b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0)
c  in CNF:
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨  b^{36, 22}_2
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨  b^{36, 22}_1
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨  p_756 ∨ -b^{36, 22}_0
c  in DIMACS:
-15734  15735 -15736  756  15737 0
-15734  15735 -15736  756  15738 0
-15734  15735 -15736  756 -15739 0

c  -2-1 --> break 
c    ( b^{36, 21}_2 ∧  b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨  b^{36, 21}_0 ∨  p_756 ∨ break
c  in DIMACS:
-15734 -15735  15736  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 21}_2 ∧ -b^{36, 21}_1 ∧ -b^{36, 21}_0 ∧ true) 
c  in CNF:
c    -b^{36, 21}_2 ∨  b^{36, 21}_1 ∨  b^{36, 21}_0 ∨ false 
c  in DIMACS:
-15734  15735  15736  0

c  3 does not represent an automaton state.
c    -(-b^{36, 21}_2 ∧  b^{36, 21}_1 ∧  b^{36, 21}_0 ∧ true) 
c  in CNF:
c     b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ false 
c  in DIMACS:
 15734 -15735 -15736  0
c  -3 does not represent an automaton state.
c    -( b^{36, 21}_2 ∧  b^{36, 21}_1 ∧  b^{36, 21}_0 ∧ true) 
c  in CNF:
c    -b^{36, 21}_2 ∨ -b^{36, 21}_1 ∨ -b^{36, 21}_0 ∨ false 
c  in DIMACS:
-15734 -15735 -15736  0

c i = 22
c  -2+1 --> -1
c    ( b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧  p_792) -> ( b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0)
c  in CNF:
c    -b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨  b^{36, 23}_2
c    -b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_1
c    -b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨  b^{36, 23}_0
c  in DIMACS:
-15737 -15738  15739 -792  15740 0
-15737 -15738  15739 -792 -15741 0
-15737 -15738  15739 -792  15742 0

c  -1+1 --> 0
c    ( b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0 ∧  p_792) -> (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧ -b^{36, 23}_0)
c  in CNF:
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_2
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_1
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_0
c  in DIMACS:
-15737  15738 -15739 -792 -15740 0
-15737  15738 -15739 -792 -15741 0
-15737  15738 -15739 -792 -15742 0

c  0+1 --> 1
c    (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧  p_792) -> (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0)
c  in CNF:
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_2
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_1
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨  b^{36, 23}_0
c  in DIMACS:
 15737  15738  15739 -792 -15740 0
 15737  15738  15739 -792 -15741 0
 15737  15738  15739 -792  15742 0

c  1+1 --> 2
c    (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0 ∧  p_792) -> (-b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0)
c  in CNF:
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_2
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨  b^{36, 23}_1
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ -p_792 ∨ -b^{36, 23}_0
c  in DIMACS:
 15737  15738 -15739 -792 -15740 0
 15737  15738 -15739 -792  15741 0
 15737  15738 -15739 -792 -15742 0

c  2+1 --> break 
c    (-b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧  p_792) -> break
c  in CNF:
c     b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 15737 -15738  15739 -792 1162 0


c  2-1 --> 1
c    (-b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧ -p_792) -> (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0)
c  in CNF:
c     b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_2
c     b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_1
c     b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨  b^{36, 23}_0
c  in DIMACS:
 15737 -15738  15739  792 -15740 0
 15737 -15738  15739  792 -15741 0
 15737 -15738  15739  792  15742 0

c  1-1 --> 0
c    (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0 ∧ -p_792) -> (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧ -b^{36, 23}_0)
c  in CNF:
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_2
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_1
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_0
c  in DIMACS:
 15737  15738 -15739  792 -15740 0
 15737  15738 -15739  792 -15741 0
 15737  15738 -15739  792 -15742 0

c  0-1 --> -1
c    (-b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧ -p_792) -> ( b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0)
c  in CNF:
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨  b^{36, 23}_2
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_1
c     b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨  b^{36, 23}_0
c  in DIMACS:
 15737  15738  15739  792  15740 0
 15737  15738  15739  792 -15741 0
 15737  15738  15739  792  15742 0

c  -1-1 --> -2
c    ( b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧  b^{36, 22}_0 ∧ -p_792) -> ( b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0)
c  in CNF:
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨  b^{36, 23}_2
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨  b^{36, 23}_1
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨  p_792 ∨ -b^{36, 23}_0
c  in DIMACS:
-15737  15738 -15739  792  15740 0
-15737  15738 -15739  792  15741 0
-15737  15738 -15739  792 -15742 0

c  -2-1 --> break 
c    ( b^{36, 22}_2 ∧  b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨  b^{36, 22}_0 ∨  p_792 ∨ break
c  in DIMACS:
-15737 -15738  15739  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 22}_2 ∧ -b^{36, 22}_1 ∧ -b^{36, 22}_0 ∧ true) 
c  in CNF:
c    -b^{36, 22}_2 ∨  b^{36, 22}_1 ∨  b^{36, 22}_0 ∨ false 
c  in DIMACS:
-15737  15738  15739  0

c  3 does not represent an automaton state.
c    -(-b^{36, 22}_2 ∧  b^{36, 22}_1 ∧  b^{36, 22}_0 ∧ true) 
c  in CNF:
c     b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ false 
c  in DIMACS:
 15737 -15738 -15739  0
c  -3 does not represent an automaton state.
c    -( b^{36, 22}_2 ∧  b^{36, 22}_1 ∧  b^{36, 22}_0 ∧ true) 
c  in CNF:
c    -b^{36, 22}_2 ∨ -b^{36, 22}_1 ∨ -b^{36, 22}_0 ∨ false 
c  in DIMACS:
-15737 -15738 -15739  0

c i = 23
c  -2+1 --> -1
c    ( b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧  p_828) -> ( b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0)
c  in CNF:
c    -b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨  b^{36, 24}_2
c    -b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_1
c    -b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨  b^{36, 24}_0
c  in DIMACS:
-15740 -15741  15742 -828  15743 0
-15740 -15741  15742 -828 -15744 0
-15740 -15741  15742 -828  15745 0

c  -1+1 --> 0
c    ( b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0 ∧  p_828) -> (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧ -b^{36, 24}_0)
c  in CNF:
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_2
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_1
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_0
c  in DIMACS:
-15740  15741 -15742 -828 -15743 0
-15740  15741 -15742 -828 -15744 0
-15740  15741 -15742 -828 -15745 0

c  0+1 --> 1
c    (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧  p_828) -> (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0)
c  in CNF:
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_2
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_1
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨  b^{36, 24}_0
c  in DIMACS:
 15740  15741  15742 -828 -15743 0
 15740  15741  15742 -828 -15744 0
 15740  15741  15742 -828  15745 0

c  1+1 --> 2
c    (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0 ∧  p_828) -> (-b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0)
c  in CNF:
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_2
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨  b^{36, 24}_1
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ -p_828 ∨ -b^{36, 24}_0
c  in DIMACS:
 15740  15741 -15742 -828 -15743 0
 15740  15741 -15742 -828  15744 0
 15740  15741 -15742 -828 -15745 0

c  2+1 --> break 
c    (-b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧  p_828) -> break
c  in CNF:
c     b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 15740 -15741  15742 -828 1162 0


c  2-1 --> 1
c    (-b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧ -p_828) -> (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0)
c  in CNF:
c     b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_2
c     b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_1
c     b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨  b^{36, 24}_0
c  in DIMACS:
 15740 -15741  15742  828 -15743 0
 15740 -15741  15742  828 -15744 0
 15740 -15741  15742  828  15745 0

c  1-1 --> 0
c    (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0 ∧ -p_828) -> (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧ -b^{36, 24}_0)
c  in CNF:
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_2
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_1
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_0
c  in DIMACS:
 15740  15741 -15742  828 -15743 0
 15740  15741 -15742  828 -15744 0
 15740  15741 -15742  828 -15745 0

c  0-1 --> -1
c    (-b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧ -p_828) -> ( b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0)
c  in CNF:
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨  b^{36, 24}_2
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_1
c     b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨  b^{36, 24}_0
c  in DIMACS:
 15740  15741  15742  828  15743 0
 15740  15741  15742  828 -15744 0
 15740  15741  15742  828  15745 0

c  -1-1 --> -2
c    ( b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧  b^{36, 23}_0 ∧ -p_828) -> ( b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0)
c  in CNF:
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨  b^{36, 24}_2
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨  b^{36, 24}_1
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨  p_828 ∨ -b^{36, 24}_0
c  in DIMACS:
-15740  15741 -15742  828  15743 0
-15740  15741 -15742  828  15744 0
-15740  15741 -15742  828 -15745 0

c  -2-1 --> break 
c    ( b^{36, 23}_2 ∧  b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨  b^{36, 23}_0 ∨  p_828 ∨ break
c  in DIMACS:
-15740 -15741  15742  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 23}_2 ∧ -b^{36, 23}_1 ∧ -b^{36, 23}_0 ∧ true) 
c  in CNF:
c    -b^{36, 23}_2 ∨  b^{36, 23}_1 ∨  b^{36, 23}_0 ∨ false 
c  in DIMACS:
-15740  15741  15742  0

c  3 does not represent an automaton state.
c    -(-b^{36, 23}_2 ∧  b^{36, 23}_1 ∧  b^{36, 23}_0 ∧ true) 
c  in CNF:
c     b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ false 
c  in DIMACS:
 15740 -15741 -15742  0
c  -3 does not represent an automaton state.
c    -( b^{36, 23}_2 ∧  b^{36, 23}_1 ∧  b^{36, 23}_0 ∧ true) 
c  in CNF:
c    -b^{36, 23}_2 ∨ -b^{36, 23}_1 ∨ -b^{36, 23}_0 ∨ false 
c  in DIMACS:
-15740 -15741 -15742  0

c i = 24
c  -2+1 --> -1
c    ( b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧  p_864) -> ( b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0)
c  in CNF:
c    -b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨  b^{36, 25}_2
c    -b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_1
c    -b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨  b^{36, 25}_0
c  in DIMACS:
-15743 -15744  15745 -864  15746 0
-15743 -15744  15745 -864 -15747 0
-15743 -15744  15745 -864  15748 0

c  -1+1 --> 0
c    ( b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0 ∧  p_864) -> (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧ -b^{36, 25}_0)
c  in CNF:
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_2
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_1
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_0
c  in DIMACS:
-15743  15744 -15745 -864 -15746 0
-15743  15744 -15745 -864 -15747 0
-15743  15744 -15745 -864 -15748 0

c  0+1 --> 1
c    (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧  p_864) -> (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0)
c  in CNF:
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_2
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_1
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨  b^{36, 25}_0
c  in DIMACS:
 15743  15744  15745 -864 -15746 0
 15743  15744  15745 -864 -15747 0
 15743  15744  15745 -864  15748 0

c  1+1 --> 2
c    (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0 ∧  p_864) -> (-b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0)
c  in CNF:
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_2
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨  b^{36, 25}_1
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ -p_864 ∨ -b^{36, 25}_0
c  in DIMACS:
 15743  15744 -15745 -864 -15746 0
 15743  15744 -15745 -864  15747 0
 15743  15744 -15745 -864 -15748 0

c  2+1 --> break 
c    (-b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧  p_864) -> break
c  in CNF:
c     b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 15743 -15744  15745 -864 1162 0


c  2-1 --> 1
c    (-b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧ -p_864) -> (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0)
c  in CNF:
c     b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_2
c     b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_1
c     b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨  b^{36, 25}_0
c  in DIMACS:
 15743 -15744  15745  864 -15746 0
 15743 -15744  15745  864 -15747 0
 15743 -15744  15745  864  15748 0

c  1-1 --> 0
c    (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0 ∧ -p_864) -> (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧ -b^{36, 25}_0)
c  in CNF:
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_2
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_1
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_0
c  in DIMACS:
 15743  15744 -15745  864 -15746 0
 15743  15744 -15745  864 -15747 0
 15743  15744 -15745  864 -15748 0

c  0-1 --> -1
c    (-b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧ -p_864) -> ( b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0)
c  in CNF:
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨  b^{36, 25}_2
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_1
c     b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨  b^{36, 25}_0
c  in DIMACS:
 15743  15744  15745  864  15746 0
 15743  15744  15745  864 -15747 0
 15743  15744  15745  864  15748 0

c  -1-1 --> -2
c    ( b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧  b^{36, 24}_0 ∧ -p_864) -> ( b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0)
c  in CNF:
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨  b^{36, 25}_2
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨  b^{36, 25}_1
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨  p_864 ∨ -b^{36, 25}_0
c  in DIMACS:
-15743  15744 -15745  864  15746 0
-15743  15744 -15745  864  15747 0
-15743  15744 -15745  864 -15748 0

c  -2-1 --> break 
c    ( b^{36, 24}_2 ∧  b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨  b^{36, 24}_0 ∨  p_864 ∨ break
c  in DIMACS:
-15743 -15744  15745  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 24}_2 ∧ -b^{36, 24}_1 ∧ -b^{36, 24}_0 ∧ true) 
c  in CNF:
c    -b^{36, 24}_2 ∨  b^{36, 24}_1 ∨  b^{36, 24}_0 ∨ false 
c  in DIMACS:
-15743  15744  15745  0

c  3 does not represent an automaton state.
c    -(-b^{36, 24}_2 ∧  b^{36, 24}_1 ∧  b^{36, 24}_0 ∧ true) 
c  in CNF:
c     b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ false 
c  in DIMACS:
 15743 -15744 -15745  0
c  -3 does not represent an automaton state.
c    -( b^{36, 24}_2 ∧  b^{36, 24}_1 ∧  b^{36, 24}_0 ∧ true) 
c  in CNF:
c    -b^{36, 24}_2 ∨ -b^{36, 24}_1 ∨ -b^{36, 24}_0 ∨ false 
c  in DIMACS:
-15743 -15744 -15745  0

c i = 25
c  -2+1 --> -1
c    ( b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧  p_900) -> ( b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0)
c  in CNF:
c    -b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨  b^{36, 26}_2
c    -b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_1
c    -b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨  b^{36, 26}_0
c  in DIMACS:
-15746 -15747  15748 -900  15749 0
-15746 -15747  15748 -900 -15750 0
-15746 -15747  15748 -900  15751 0

c  -1+1 --> 0
c    ( b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0 ∧  p_900) -> (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧ -b^{36, 26}_0)
c  in CNF:
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_2
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_1
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_0
c  in DIMACS:
-15746  15747 -15748 -900 -15749 0
-15746  15747 -15748 -900 -15750 0
-15746  15747 -15748 -900 -15751 0

c  0+1 --> 1
c    (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧  p_900) -> (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0)
c  in CNF:
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_2
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_1
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨  b^{36, 26}_0
c  in DIMACS:
 15746  15747  15748 -900 -15749 0
 15746  15747  15748 -900 -15750 0
 15746  15747  15748 -900  15751 0

c  1+1 --> 2
c    (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0 ∧  p_900) -> (-b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0)
c  in CNF:
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_2
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨  b^{36, 26}_1
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ -p_900 ∨ -b^{36, 26}_0
c  in DIMACS:
 15746  15747 -15748 -900 -15749 0
 15746  15747 -15748 -900  15750 0
 15746  15747 -15748 -900 -15751 0

c  2+1 --> break 
c    (-b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧  p_900) -> break
c  in CNF:
c     b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 15746 -15747  15748 -900 1162 0


c  2-1 --> 1
c    (-b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧ -p_900) -> (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0)
c  in CNF:
c     b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_2
c     b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_1
c     b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨  b^{36, 26}_0
c  in DIMACS:
 15746 -15747  15748  900 -15749 0
 15746 -15747  15748  900 -15750 0
 15746 -15747  15748  900  15751 0

c  1-1 --> 0
c    (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0 ∧ -p_900) -> (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧ -b^{36, 26}_0)
c  in CNF:
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_2
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_1
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_0
c  in DIMACS:
 15746  15747 -15748  900 -15749 0
 15746  15747 -15748  900 -15750 0
 15746  15747 -15748  900 -15751 0

c  0-1 --> -1
c    (-b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧ -p_900) -> ( b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0)
c  in CNF:
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨  b^{36, 26}_2
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_1
c     b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨  b^{36, 26}_0
c  in DIMACS:
 15746  15747  15748  900  15749 0
 15746  15747  15748  900 -15750 0
 15746  15747  15748  900  15751 0

c  -1-1 --> -2
c    ( b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧  b^{36, 25}_0 ∧ -p_900) -> ( b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0)
c  in CNF:
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨  b^{36, 26}_2
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨  b^{36, 26}_1
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨  p_900 ∨ -b^{36, 26}_0
c  in DIMACS:
-15746  15747 -15748  900  15749 0
-15746  15747 -15748  900  15750 0
-15746  15747 -15748  900 -15751 0

c  -2-1 --> break 
c    ( b^{36, 25}_2 ∧  b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨  b^{36, 25}_0 ∨  p_900 ∨ break
c  in DIMACS:
-15746 -15747  15748  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 25}_2 ∧ -b^{36, 25}_1 ∧ -b^{36, 25}_0 ∧ true) 
c  in CNF:
c    -b^{36, 25}_2 ∨  b^{36, 25}_1 ∨  b^{36, 25}_0 ∨ false 
c  in DIMACS:
-15746  15747  15748  0

c  3 does not represent an automaton state.
c    -(-b^{36, 25}_2 ∧  b^{36, 25}_1 ∧  b^{36, 25}_0 ∧ true) 
c  in CNF:
c     b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ false 
c  in DIMACS:
 15746 -15747 -15748  0
c  -3 does not represent an automaton state.
c    -( b^{36, 25}_2 ∧  b^{36, 25}_1 ∧  b^{36, 25}_0 ∧ true) 
c  in CNF:
c    -b^{36, 25}_2 ∨ -b^{36, 25}_1 ∨ -b^{36, 25}_0 ∨ false 
c  in DIMACS:
-15746 -15747 -15748  0

c i = 26
c  -2+1 --> -1
c    ( b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧  p_936) -> ( b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0)
c  in CNF:
c    -b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨  b^{36, 27}_2
c    -b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_1
c    -b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨  b^{36, 27}_0
c  in DIMACS:
-15749 -15750  15751 -936  15752 0
-15749 -15750  15751 -936 -15753 0
-15749 -15750  15751 -936  15754 0

c  -1+1 --> 0
c    ( b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0 ∧  p_936) -> (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧ -b^{36, 27}_0)
c  in CNF:
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_2
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_1
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_0
c  in DIMACS:
-15749  15750 -15751 -936 -15752 0
-15749  15750 -15751 -936 -15753 0
-15749  15750 -15751 -936 -15754 0

c  0+1 --> 1
c    (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧  p_936) -> (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0)
c  in CNF:
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_2
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_1
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨  b^{36, 27}_0
c  in DIMACS:
 15749  15750  15751 -936 -15752 0
 15749  15750  15751 -936 -15753 0
 15749  15750  15751 -936  15754 0

c  1+1 --> 2
c    (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0 ∧  p_936) -> (-b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0)
c  in CNF:
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_2
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨  b^{36, 27}_1
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ -p_936 ∨ -b^{36, 27}_0
c  in DIMACS:
 15749  15750 -15751 -936 -15752 0
 15749  15750 -15751 -936  15753 0
 15749  15750 -15751 -936 -15754 0

c  2+1 --> break 
c    (-b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧  p_936) -> break
c  in CNF:
c     b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 15749 -15750  15751 -936 1162 0


c  2-1 --> 1
c    (-b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧ -p_936) -> (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0)
c  in CNF:
c     b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_2
c     b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_1
c     b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨  b^{36, 27}_0
c  in DIMACS:
 15749 -15750  15751  936 -15752 0
 15749 -15750  15751  936 -15753 0
 15749 -15750  15751  936  15754 0

c  1-1 --> 0
c    (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0 ∧ -p_936) -> (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧ -b^{36, 27}_0)
c  in CNF:
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_2
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_1
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_0
c  in DIMACS:
 15749  15750 -15751  936 -15752 0
 15749  15750 -15751  936 -15753 0
 15749  15750 -15751  936 -15754 0

c  0-1 --> -1
c    (-b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧ -p_936) -> ( b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0)
c  in CNF:
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨  b^{36, 27}_2
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_1
c     b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨  b^{36, 27}_0
c  in DIMACS:
 15749  15750  15751  936  15752 0
 15749  15750  15751  936 -15753 0
 15749  15750  15751  936  15754 0

c  -1-1 --> -2
c    ( b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧  b^{36, 26}_0 ∧ -p_936) -> ( b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0)
c  in CNF:
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨  b^{36, 27}_2
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨  b^{36, 27}_1
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨  p_936 ∨ -b^{36, 27}_0
c  in DIMACS:
-15749  15750 -15751  936  15752 0
-15749  15750 -15751  936  15753 0
-15749  15750 -15751  936 -15754 0

c  -2-1 --> break 
c    ( b^{36, 26}_2 ∧  b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨  b^{36, 26}_0 ∨  p_936 ∨ break
c  in DIMACS:
-15749 -15750  15751  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 26}_2 ∧ -b^{36, 26}_1 ∧ -b^{36, 26}_0 ∧ true) 
c  in CNF:
c    -b^{36, 26}_2 ∨  b^{36, 26}_1 ∨  b^{36, 26}_0 ∨ false 
c  in DIMACS:
-15749  15750  15751  0

c  3 does not represent an automaton state.
c    -(-b^{36, 26}_2 ∧  b^{36, 26}_1 ∧  b^{36, 26}_0 ∧ true) 
c  in CNF:
c     b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ false 
c  in DIMACS:
 15749 -15750 -15751  0
c  -3 does not represent an automaton state.
c    -( b^{36, 26}_2 ∧  b^{36, 26}_1 ∧  b^{36, 26}_0 ∧ true) 
c  in CNF:
c    -b^{36, 26}_2 ∨ -b^{36, 26}_1 ∨ -b^{36, 26}_0 ∨ false 
c  in DIMACS:
-15749 -15750 -15751  0

c i = 27
c  -2+1 --> -1
c    ( b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧  p_972) -> ( b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0)
c  in CNF:
c    -b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨  b^{36, 28}_2
c    -b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_1
c    -b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨  b^{36, 28}_0
c  in DIMACS:
-15752 -15753  15754 -972  15755 0
-15752 -15753  15754 -972 -15756 0
-15752 -15753  15754 -972  15757 0

c  -1+1 --> 0
c    ( b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0 ∧  p_972) -> (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧ -b^{36, 28}_0)
c  in CNF:
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_2
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_1
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_0
c  in DIMACS:
-15752  15753 -15754 -972 -15755 0
-15752  15753 -15754 -972 -15756 0
-15752  15753 -15754 -972 -15757 0

c  0+1 --> 1
c    (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧  p_972) -> (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0)
c  in CNF:
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_2
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_1
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨  b^{36, 28}_0
c  in DIMACS:
 15752  15753  15754 -972 -15755 0
 15752  15753  15754 -972 -15756 0
 15752  15753  15754 -972  15757 0

c  1+1 --> 2
c    (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0 ∧  p_972) -> (-b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0)
c  in CNF:
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_2
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨  b^{36, 28}_1
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ -p_972 ∨ -b^{36, 28}_0
c  in DIMACS:
 15752  15753 -15754 -972 -15755 0
 15752  15753 -15754 -972  15756 0
 15752  15753 -15754 -972 -15757 0

c  2+1 --> break 
c    (-b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧  p_972) -> break
c  in CNF:
c     b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 15752 -15753  15754 -972 1162 0


c  2-1 --> 1
c    (-b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧ -p_972) -> (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0)
c  in CNF:
c     b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_2
c     b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_1
c     b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨  b^{36, 28}_0
c  in DIMACS:
 15752 -15753  15754  972 -15755 0
 15752 -15753  15754  972 -15756 0
 15752 -15753  15754  972  15757 0

c  1-1 --> 0
c    (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0 ∧ -p_972) -> (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧ -b^{36, 28}_0)
c  in CNF:
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_2
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_1
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_0
c  in DIMACS:
 15752  15753 -15754  972 -15755 0
 15752  15753 -15754  972 -15756 0
 15752  15753 -15754  972 -15757 0

c  0-1 --> -1
c    (-b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧ -p_972) -> ( b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0)
c  in CNF:
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨  b^{36, 28}_2
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_1
c     b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨  b^{36, 28}_0
c  in DIMACS:
 15752  15753  15754  972  15755 0
 15752  15753  15754  972 -15756 0
 15752  15753  15754  972  15757 0

c  -1-1 --> -2
c    ( b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧  b^{36, 27}_0 ∧ -p_972) -> ( b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0)
c  in CNF:
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨  b^{36, 28}_2
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨  b^{36, 28}_1
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨  p_972 ∨ -b^{36, 28}_0
c  in DIMACS:
-15752  15753 -15754  972  15755 0
-15752  15753 -15754  972  15756 0
-15752  15753 -15754  972 -15757 0

c  -2-1 --> break 
c    ( b^{36, 27}_2 ∧  b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨  b^{36, 27}_0 ∨  p_972 ∨ break
c  in DIMACS:
-15752 -15753  15754  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 27}_2 ∧ -b^{36, 27}_1 ∧ -b^{36, 27}_0 ∧ true) 
c  in CNF:
c    -b^{36, 27}_2 ∨  b^{36, 27}_1 ∨  b^{36, 27}_0 ∨ false 
c  in DIMACS:
-15752  15753  15754  0

c  3 does not represent an automaton state.
c    -(-b^{36, 27}_2 ∧  b^{36, 27}_1 ∧  b^{36, 27}_0 ∧ true) 
c  in CNF:
c     b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ false 
c  in DIMACS:
 15752 -15753 -15754  0
c  -3 does not represent an automaton state.
c    -( b^{36, 27}_2 ∧  b^{36, 27}_1 ∧  b^{36, 27}_0 ∧ true) 
c  in CNF:
c    -b^{36, 27}_2 ∨ -b^{36, 27}_1 ∨ -b^{36, 27}_0 ∨ false 
c  in DIMACS:
-15752 -15753 -15754  0

c i = 28
c  -2+1 --> -1
c    ( b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧  p_1008) -> ( b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0)
c  in CNF:
c    -b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨  b^{36, 29}_2
c    -b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_1
c    -b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨  b^{36, 29}_0
c  in DIMACS:
-15755 -15756  15757 -1008  15758 0
-15755 -15756  15757 -1008 -15759 0
-15755 -15756  15757 -1008  15760 0

c  -1+1 --> 0
c    ( b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0 ∧  p_1008) -> (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧ -b^{36, 29}_0)
c  in CNF:
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_2
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_1
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_0
c  in DIMACS:
-15755  15756 -15757 -1008 -15758 0
-15755  15756 -15757 -1008 -15759 0
-15755  15756 -15757 -1008 -15760 0

c  0+1 --> 1
c    (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧  p_1008) -> (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0)
c  in CNF:
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_2
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_1
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨  b^{36, 29}_0
c  in DIMACS:
 15755  15756  15757 -1008 -15758 0
 15755  15756  15757 -1008 -15759 0
 15755  15756  15757 -1008  15760 0

c  1+1 --> 2
c    (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0 ∧  p_1008) -> (-b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0)
c  in CNF:
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_2
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨  b^{36, 29}_1
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ -p_1008 ∨ -b^{36, 29}_0
c  in DIMACS:
 15755  15756 -15757 -1008 -15758 0
 15755  15756 -15757 -1008  15759 0
 15755  15756 -15757 -1008 -15760 0

c  2+1 --> break 
c    (-b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 15755 -15756  15757 -1008 1162 0


c  2-1 --> 1
c    (-b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧ -p_1008) -> (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0)
c  in CNF:
c     b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_2
c     b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_1
c     b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨  b^{36, 29}_0
c  in DIMACS:
 15755 -15756  15757  1008 -15758 0
 15755 -15756  15757  1008 -15759 0
 15755 -15756  15757  1008  15760 0

c  1-1 --> 0
c    (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0 ∧ -p_1008) -> (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧ -b^{36, 29}_0)
c  in CNF:
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_2
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_1
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_0
c  in DIMACS:
 15755  15756 -15757  1008 -15758 0
 15755  15756 -15757  1008 -15759 0
 15755  15756 -15757  1008 -15760 0

c  0-1 --> -1
c    (-b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧ -p_1008) -> ( b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0)
c  in CNF:
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨  b^{36, 29}_2
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_1
c     b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨  b^{36, 29}_0
c  in DIMACS:
 15755  15756  15757  1008  15758 0
 15755  15756  15757  1008 -15759 0
 15755  15756  15757  1008  15760 0

c  -1-1 --> -2
c    ( b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧  b^{36, 28}_0 ∧ -p_1008) -> ( b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0)
c  in CNF:
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨  b^{36, 29}_2
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨  b^{36, 29}_1
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨  p_1008 ∨ -b^{36, 29}_0
c  in DIMACS:
-15755  15756 -15757  1008  15758 0
-15755  15756 -15757  1008  15759 0
-15755  15756 -15757  1008 -15760 0

c  -2-1 --> break 
c    ( b^{36, 28}_2 ∧  b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨  b^{36, 28}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-15755 -15756  15757  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 28}_2 ∧ -b^{36, 28}_1 ∧ -b^{36, 28}_0 ∧ true) 
c  in CNF:
c    -b^{36, 28}_2 ∨  b^{36, 28}_1 ∨  b^{36, 28}_0 ∨ false 
c  in DIMACS:
-15755  15756  15757  0

c  3 does not represent an automaton state.
c    -(-b^{36, 28}_2 ∧  b^{36, 28}_1 ∧  b^{36, 28}_0 ∧ true) 
c  in CNF:
c     b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ false 
c  in DIMACS:
 15755 -15756 -15757  0
c  -3 does not represent an automaton state.
c    -( b^{36, 28}_2 ∧  b^{36, 28}_1 ∧  b^{36, 28}_0 ∧ true) 
c  in CNF:
c    -b^{36, 28}_2 ∨ -b^{36, 28}_1 ∨ -b^{36, 28}_0 ∨ false 
c  in DIMACS:
-15755 -15756 -15757  0

c i = 29
c  -2+1 --> -1
c    ( b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧  p_1044) -> ( b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0)
c  in CNF:
c    -b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨  b^{36, 30}_2
c    -b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_1
c    -b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨  b^{36, 30}_0
c  in DIMACS:
-15758 -15759  15760 -1044  15761 0
-15758 -15759  15760 -1044 -15762 0
-15758 -15759  15760 -1044  15763 0

c  -1+1 --> 0
c    ( b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0 ∧  p_1044) -> (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧ -b^{36, 30}_0)
c  in CNF:
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_2
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_1
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_0
c  in DIMACS:
-15758  15759 -15760 -1044 -15761 0
-15758  15759 -15760 -1044 -15762 0
-15758  15759 -15760 -1044 -15763 0

c  0+1 --> 1
c    (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧  p_1044) -> (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0)
c  in CNF:
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_2
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_1
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨  b^{36, 30}_0
c  in DIMACS:
 15758  15759  15760 -1044 -15761 0
 15758  15759  15760 -1044 -15762 0
 15758  15759  15760 -1044  15763 0

c  1+1 --> 2
c    (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0 ∧  p_1044) -> (-b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0)
c  in CNF:
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_2
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨  b^{36, 30}_1
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ -p_1044 ∨ -b^{36, 30}_0
c  in DIMACS:
 15758  15759 -15760 -1044 -15761 0
 15758  15759 -15760 -1044  15762 0
 15758  15759 -15760 -1044 -15763 0

c  2+1 --> break 
c    (-b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 15758 -15759  15760 -1044 1162 0


c  2-1 --> 1
c    (-b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧ -p_1044) -> (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0)
c  in CNF:
c     b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_2
c     b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_1
c     b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨  b^{36, 30}_0
c  in DIMACS:
 15758 -15759  15760  1044 -15761 0
 15758 -15759  15760  1044 -15762 0
 15758 -15759  15760  1044  15763 0

c  1-1 --> 0
c    (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0 ∧ -p_1044) -> (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧ -b^{36, 30}_0)
c  in CNF:
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_2
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_1
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_0
c  in DIMACS:
 15758  15759 -15760  1044 -15761 0
 15758  15759 -15760  1044 -15762 0
 15758  15759 -15760  1044 -15763 0

c  0-1 --> -1
c    (-b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧ -p_1044) -> ( b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0)
c  in CNF:
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨  b^{36, 30}_2
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_1
c     b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨  b^{36, 30}_0
c  in DIMACS:
 15758  15759  15760  1044  15761 0
 15758  15759  15760  1044 -15762 0
 15758  15759  15760  1044  15763 0

c  -1-1 --> -2
c    ( b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧  b^{36, 29}_0 ∧ -p_1044) -> ( b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0)
c  in CNF:
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨  b^{36, 30}_2
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨  b^{36, 30}_1
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨  p_1044 ∨ -b^{36, 30}_0
c  in DIMACS:
-15758  15759 -15760  1044  15761 0
-15758  15759 -15760  1044  15762 0
-15758  15759 -15760  1044 -15763 0

c  -2-1 --> break 
c    ( b^{36, 29}_2 ∧  b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨  b^{36, 29}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-15758 -15759  15760  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 29}_2 ∧ -b^{36, 29}_1 ∧ -b^{36, 29}_0 ∧ true) 
c  in CNF:
c    -b^{36, 29}_2 ∨  b^{36, 29}_1 ∨  b^{36, 29}_0 ∨ false 
c  in DIMACS:
-15758  15759  15760  0

c  3 does not represent an automaton state.
c    -(-b^{36, 29}_2 ∧  b^{36, 29}_1 ∧  b^{36, 29}_0 ∧ true) 
c  in CNF:
c     b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ false 
c  in DIMACS:
 15758 -15759 -15760  0
c  -3 does not represent an automaton state.
c    -( b^{36, 29}_2 ∧  b^{36, 29}_1 ∧  b^{36, 29}_0 ∧ true) 
c  in CNF:
c    -b^{36, 29}_2 ∨ -b^{36, 29}_1 ∨ -b^{36, 29}_0 ∨ false 
c  in DIMACS:
-15758 -15759 -15760  0

c i = 30
c  -2+1 --> -1
c    ( b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧  p_1080) -> ( b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0)
c  in CNF:
c    -b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨  b^{36, 31}_2
c    -b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_1
c    -b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨  b^{36, 31}_0
c  in DIMACS:
-15761 -15762  15763 -1080  15764 0
-15761 -15762  15763 -1080 -15765 0
-15761 -15762  15763 -1080  15766 0

c  -1+1 --> 0
c    ( b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0 ∧  p_1080) -> (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧ -b^{36, 31}_0)
c  in CNF:
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_2
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_1
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_0
c  in DIMACS:
-15761  15762 -15763 -1080 -15764 0
-15761  15762 -15763 -1080 -15765 0
-15761  15762 -15763 -1080 -15766 0

c  0+1 --> 1
c    (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧  p_1080) -> (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0)
c  in CNF:
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_2
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_1
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨  b^{36, 31}_0
c  in DIMACS:
 15761  15762  15763 -1080 -15764 0
 15761  15762  15763 -1080 -15765 0
 15761  15762  15763 -1080  15766 0

c  1+1 --> 2
c    (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0 ∧  p_1080) -> (-b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0)
c  in CNF:
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_2
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨  b^{36, 31}_1
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ -p_1080 ∨ -b^{36, 31}_0
c  in DIMACS:
 15761  15762 -15763 -1080 -15764 0
 15761  15762 -15763 -1080  15765 0
 15761  15762 -15763 -1080 -15766 0

c  2+1 --> break 
c    (-b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 15761 -15762  15763 -1080 1162 0


c  2-1 --> 1
c    (-b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧ -p_1080) -> (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0)
c  in CNF:
c     b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_2
c     b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_1
c     b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨  b^{36, 31}_0
c  in DIMACS:
 15761 -15762  15763  1080 -15764 0
 15761 -15762  15763  1080 -15765 0
 15761 -15762  15763  1080  15766 0

c  1-1 --> 0
c    (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0 ∧ -p_1080) -> (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧ -b^{36, 31}_0)
c  in CNF:
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_2
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_1
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_0
c  in DIMACS:
 15761  15762 -15763  1080 -15764 0
 15761  15762 -15763  1080 -15765 0
 15761  15762 -15763  1080 -15766 0

c  0-1 --> -1
c    (-b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧ -p_1080) -> ( b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0)
c  in CNF:
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨  b^{36, 31}_2
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_1
c     b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨  b^{36, 31}_0
c  in DIMACS:
 15761  15762  15763  1080  15764 0
 15761  15762  15763  1080 -15765 0
 15761  15762  15763  1080  15766 0

c  -1-1 --> -2
c    ( b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧  b^{36, 30}_0 ∧ -p_1080) -> ( b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0)
c  in CNF:
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨  b^{36, 31}_2
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨  b^{36, 31}_1
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨  p_1080 ∨ -b^{36, 31}_0
c  in DIMACS:
-15761  15762 -15763  1080  15764 0
-15761  15762 -15763  1080  15765 0
-15761  15762 -15763  1080 -15766 0

c  -2-1 --> break 
c    ( b^{36, 30}_2 ∧  b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨  b^{36, 30}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-15761 -15762  15763  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 30}_2 ∧ -b^{36, 30}_1 ∧ -b^{36, 30}_0 ∧ true) 
c  in CNF:
c    -b^{36, 30}_2 ∨  b^{36, 30}_1 ∨  b^{36, 30}_0 ∨ false 
c  in DIMACS:
-15761  15762  15763  0

c  3 does not represent an automaton state.
c    -(-b^{36, 30}_2 ∧  b^{36, 30}_1 ∧  b^{36, 30}_0 ∧ true) 
c  in CNF:
c     b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ false 
c  in DIMACS:
 15761 -15762 -15763  0
c  -3 does not represent an automaton state.
c    -( b^{36, 30}_2 ∧  b^{36, 30}_1 ∧  b^{36, 30}_0 ∧ true) 
c  in CNF:
c    -b^{36, 30}_2 ∨ -b^{36, 30}_1 ∨ -b^{36, 30}_0 ∨ false 
c  in DIMACS:
-15761 -15762 -15763  0

c i = 31
c  -2+1 --> -1
c    ( b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧  p_1116) -> ( b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0)
c  in CNF:
c    -b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨  b^{36, 32}_2
c    -b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_1
c    -b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨  b^{36, 32}_0
c  in DIMACS:
-15764 -15765  15766 -1116  15767 0
-15764 -15765  15766 -1116 -15768 0
-15764 -15765  15766 -1116  15769 0

c  -1+1 --> 0
c    ( b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0 ∧  p_1116) -> (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧ -b^{36, 32}_0)
c  in CNF:
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_2
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_1
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_0
c  in DIMACS:
-15764  15765 -15766 -1116 -15767 0
-15764  15765 -15766 -1116 -15768 0
-15764  15765 -15766 -1116 -15769 0

c  0+1 --> 1
c    (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧  p_1116) -> (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0)
c  in CNF:
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_2
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_1
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨  b^{36, 32}_0
c  in DIMACS:
 15764  15765  15766 -1116 -15767 0
 15764  15765  15766 -1116 -15768 0
 15764  15765  15766 -1116  15769 0

c  1+1 --> 2
c    (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0 ∧  p_1116) -> (-b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0)
c  in CNF:
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_2
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨  b^{36, 32}_1
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ -p_1116 ∨ -b^{36, 32}_0
c  in DIMACS:
 15764  15765 -15766 -1116 -15767 0
 15764  15765 -15766 -1116  15768 0
 15764  15765 -15766 -1116 -15769 0

c  2+1 --> break 
c    (-b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 15764 -15765  15766 -1116 1162 0


c  2-1 --> 1
c    (-b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧ -p_1116) -> (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0)
c  in CNF:
c     b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_2
c     b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_1
c     b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨  b^{36, 32}_0
c  in DIMACS:
 15764 -15765  15766  1116 -15767 0
 15764 -15765  15766  1116 -15768 0
 15764 -15765  15766  1116  15769 0

c  1-1 --> 0
c    (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0 ∧ -p_1116) -> (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧ -b^{36, 32}_0)
c  in CNF:
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_2
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_1
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_0
c  in DIMACS:
 15764  15765 -15766  1116 -15767 0
 15764  15765 -15766  1116 -15768 0
 15764  15765 -15766  1116 -15769 0

c  0-1 --> -1
c    (-b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧ -p_1116) -> ( b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0)
c  in CNF:
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨  b^{36, 32}_2
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_1
c     b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨  b^{36, 32}_0
c  in DIMACS:
 15764  15765  15766  1116  15767 0
 15764  15765  15766  1116 -15768 0
 15764  15765  15766  1116  15769 0

c  -1-1 --> -2
c    ( b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧  b^{36, 31}_0 ∧ -p_1116) -> ( b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0)
c  in CNF:
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨  b^{36, 32}_2
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨  b^{36, 32}_1
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨  p_1116 ∨ -b^{36, 32}_0
c  in DIMACS:
-15764  15765 -15766  1116  15767 0
-15764  15765 -15766  1116  15768 0
-15764  15765 -15766  1116 -15769 0

c  -2-1 --> break 
c    ( b^{36, 31}_2 ∧  b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨  b^{36, 31}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-15764 -15765  15766  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 31}_2 ∧ -b^{36, 31}_1 ∧ -b^{36, 31}_0 ∧ true) 
c  in CNF:
c    -b^{36, 31}_2 ∨  b^{36, 31}_1 ∨  b^{36, 31}_0 ∨ false 
c  in DIMACS:
-15764  15765  15766  0

c  3 does not represent an automaton state.
c    -(-b^{36, 31}_2 ∧  b^{36, 31}_1 ∧  b^{36, 31}_0 ∧ true) 
c  in CNF:
c     b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ false 
c  in DIMACS:
 15764 -15765 -15766  0
c  -3 does not represent an automaton state.
c    -( b^{36, 31}_2 ∧  b^{36, 31}_1 ∧  b^{36, 31}_0 ∧ true) 
c  in CNF:
c    -b^{36, 31}_2 ∨ -b^{36, 31}_1 ∨ -b^{36, 31}_0 ∨ false 
c  in DIMACS:
-15764 -15765 -15766  0

c i = 32
c  -2+1 --> -1
c    ( b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧  p_1152) -> ( b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧  b^{36, 33}_0)
c  in CNF:
c    -b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨  b^{36, 33}_2
c    -b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_1
c    -b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨  b^{36, 33}_0
c  in DIMACS:
-15767 -15768  15769 -1152  15770 0
-15767 -15768  15769 -1152 -15771 0
-15767 -15768  15769 -1152  15772 0

c  -1+1 --> 0
c    ( b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0 ∧  p_1152) -> (-b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧ -b^{36, 33}_0)
c  in CNF:
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_2
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_1
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_0
c  in DIMACS:
-15767  15768 -15769 -1152 -15770 0
-15767  15768 -15769 -1152 -15771 0
-15767  15768 -15769 -1152 -15772 0

c  0+1 --> 1
c    (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧  p_1152) -> (-b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧  b^{36, 33}_0)
c  in CNF:
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_2
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_1
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨  b^{36, 33}_0
c  in DIMACS:
 15767  15768  15769 -1152 -15770 0
 15767  15768  15769 -1152 -15771 0
 15767  15768  15769 -1152  15772 0

c  1+1 --> 2
c    (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0 ∧  p_1152) -> (-b^{36, 33}_2 ∧  b^{36, 33}_1 ∧ -b^{36, 33}_0)
c  in CNF:
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_2
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨  b^{36, 33}_1
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ -p_1152 ∨ -b^{36, 33}_0
c  in DIMACS:
 15767  15768 -15769 -1152 -15770 0
 15767  15768 -15769 -1152  15771 0
 15767  15768 -15769 -1152 -15772 0

c  2+1 --> break 
c    (-b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 15767 -15768  15769 -1152 1162 0


c  2-1 --> 1
c    (-b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧ -p_1152) -> (-b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧  b^{36, 33}_0)
c  in CNF:
c     b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_2
c     b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_1
c     b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨  b^{36, 33}_0
c  in DIMACS:
 15767 -15768  15769  1152 -15770 0
 15767 -15768  15769  1152 -15771 0
 15767 -15768  15769  1152  15772 0

c  1-1 --> 0
c    (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0 ∧ -p_1152) -> (-b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧ -b^{36, 33}_0)
c  in CNF:
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_2
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_1
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_0
c  in DIMACS:
 15767  15768 -15769  1152 -15770 0
 15767  15768 -15769  1152 -15771 0
 15767  15768 -15769  1152 -15772 0

c  0-1 --> -1
c    (-b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧ -p_1152) -> ( b^{36, 33}_2 ∧ -b^{36, 33}_1 ∧  b^{36, 33}_0)
c  in CNF:
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨  b^{36, 33}_2
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_1
c     b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨  b^{36, 33}_0
c  in DIMACS:
 15767  15768  15769  1152  15770 0
 15767  15768  15769  1152 -15771 0
 15767  15768  15769  1152  15772 0

c  -1-1 --> -2
c    ( b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧  b^{36, 32}_0 ∧ -p_1152) -> ( b^{36, 33}_2 ∧  b^{36, 33}_1 ∧ -b^{36, 33}_0)
c  in CNF:
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨  b^{36, 33}_2
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨  b^{36, 33}_1
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨  p_1152 ∨ -b^{36, 33}_0
c  in DIMACS:
-15767  15768 -15769  1152  15770 0
-15767  15768 -15769  1152  15771 0
-15767  15768 -15769  1152 -15772 0

c  -2-1 --> break 
c    ( b^{36, 32}_2 ∧  b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨  b^{36, 32}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-15767 -15768  15769  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{36, 32}_2 ∧ -b^{36, 32}_1 ∧ -b^{36, 32}_0 ∧ true) 
c  in CNF:
c    -b^{36, 32}_2 ∨  b^{36, 32}_1 ∨  b^{36, 32}_0 ∨ false 
c  in DIMACS:
-15767  15768  15769  0

c  3 does not represent an automaton state.
c    -(-b^{36, 32}_2 ∧  b^{36, 32}_1 ∧  b^{36, 32}_0 ∧ true) 
c  in CNF:
c     b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ false 
c  in DIMACS:
 15767 -15768 -15769  0
c  -3 does not represent an automaton state.
c    -( b^{36, 32}_2 ∧  b^{36, 32}_1 ∧  b^{36, 32}_0 ∧ true) 
c  in CNF:
c    -b^{36, 32}_2 ∨ -b^{36, 32}_1 ∨ -b^{36, 32}_0 ∨ false 
c  in DIMACS:
-15767 -15768 -15769  0

c INIT for k = 37
c    -b^{37, 1}_2
c    -b^{37, 1}_1
c    -b^{37, 1}_0
c  in DIMACS:
-15773 0
-15774 0
-15775 0

c Transitions for k = 37
c i = 1
c  -2+1 --> -1
c    ( b^{37, 1}_2 ∧  b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧  p_37) -> ( b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0)
c  in CNF:
c    -b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨  b^{37, 2}_2
c    -b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_1
c    -b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨  b^{37, 2}_0
c  in DIMACS:
-15773 -15774  15775 -37  15776 0
-15773 -15774  15775 -37 -15777 0
-15773 -15774  15775 -37  15778 0

c  -1+1 --> 0
c    ( b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧  b^{37, 1}_0 ∧  p_37) -> (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧ -b^{37, 2}_0)
c  in CNF:
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_2
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_1
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_0
c  in DIMACS:
-15773  15774 -15775 -37 -15776 0
-15773  15774 -15775 -37 -15777 0
-15773  15774 -15775 -37 -15778 0

c  0+1 --> 1
c    (-b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧  p_37) -> (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0)
c  in CNF:
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_2
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_1
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨  b^{37, 2}_0
c  in DIMACS:
 15773  15774  15775 -37 -15776 0
 15773  15774  15775 -37 -15777 0
 15773  15774  15775 -37  15778 0

c  1+1 --> 2
c    (-b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧  b^{37, 1}_0 ∧  p_37) -> (-b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0)
c  in CNF:
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_2
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨  b^{37, 2}_1
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ -p_37 ∨ -b^{37, 2}_0
c  in DIMACS:
 15773  15774 -15775 -37 -15776 0
 15773  15774 -15775 -37  15777 0
 15773  15774 -15775 -37 -15778 0

c  2+1 --> break 
c    (-b^{37, 1}_2 ∧  b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧  p_37) -> break
c  in CNF:
c     b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ -p_37 ∨ break
c  in DIMACS:
 15773 -15774  15775 -37 1162 0


c  2-1 --> 1
c    (-b^{37, 1}_2 ∧  b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧ -p_37) -> (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0)
c  in CNF:
c     b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_2
c     b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_1
c     b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨  b^{37, 2}_0
c  in DIMACS:
 15773 -15774  15775  37 -15776 0
 15773 -15774  15775  37 -15777 0
 15773 -15774  15775  37  15778 0

c  1-1 --> 0
c    (-b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧  b^{37, 1}_0 ∧ -p_37) -> (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧ -b^{37, 2}_0)
c  in CNF:
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_2
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_1
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_0
c  in DIMACS:
 15773  15774 -15775  37 -15776 0
 15773  15774 -15775  37 -15777 0
 15773  15774 -15775  37 -15778 0

c  0-1 --> -1
c    (-b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧ -p_37) -> ( b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0)
c  in CNF:
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨  b^{37, 2}_2
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_1
c     b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨  b^{37, 2}_0
c  in DIMACS:
 15773  15774  15775  37  15776 0
 15773  15774  15775  37 -15777 0
 15773  15774  15775  37  15778 0

c  -1-1 --> -2
c    ( b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧  b^{37, 1}_0 ∧ -p_37) -> ( b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0)
c  in CNF:
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨  b^{37, 2}_2
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨  b^{37, 2}_1
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨  p_37 ∨ -b^{37, 2}_0
c  in DIMACS:
-15773  15774 -15775  37  15776 0
-15773  15774 -15775  37  15777 0
-15773  15774 -15775  37 -15778 0

c  -2-1 --> break 
c    ( b^{37, 1}_2 ∧  b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧ -p_37) -> break
c  in CNF:
c    -b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨  b^{37, 1}_0 ∨  p_37 ∨ break
c  in DIMACS:
-15773 -15774  15775  37 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 1}_2 ∧ -b^{37, 1}_1 ∧ -b^{37, 1}_0 ∧ true) 
c  in CNF:
c    -b^{37, 1}_2 ∨  b^{37, 1}_1 ∨  b^{37, 1}_0 ∨ false 
c  in DIMACS:
-15773  15774  15775  0

c  3 does not represent an automaton state.
c    -(-b^{37, 1}_2 ∧  b^{37, 1}_1 ∧  b^{37, 1}_0 ∧ true) 
c  in CNF:
c     b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ false 
c  in DIMACS:
 15773 -15774 -15775  0
c  -3 does not represent an automaton state.
c    -( b^{37, 1}_2 ∧  b^{37, 1}_1 ∧  b^{37, 1}_0 ∧ true) 
c  in CNF:
c    -b^{37, 1}_2 ∨ -b^{37, 1}_1 ∨ -b^{37, 1}_0 ∨ false 
c  in DIMACS:
-15773 -15774 -15775  0

c i = 2
c  -2+1 --> -1
c    ( b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧  p_74) -> ( b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0)
c  in CNF:
c    -b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨  b^{37, 3}_2
c    -b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_1
c    -b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨  b^{37, 3}_0
c  in DIMACS:
-15776 -15777  15778 -74  15779 0
-15776 -15777  15778 -74 -15780 0
-15776 -15777  15778 -74  15781 0

c  -1+1 --> 0
c    ( b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0 ∧  p_74) -> (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧ -b^{37, 3}_0)
c  in CNF:
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_2
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_1
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_0
c  in DIMACS:
-15776  15777 -15778 -74 -15779 0
-15776  15777 -15778 -74 -15780 0
-15776  15777 -15778 -74 -15781 0

c  0+1 --> 1
c    (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧  p_74) -> (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0)
c  in CNF:
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_2
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_1
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨  b^{37, 3}_0
c  in DIMACS:
 15776  15777  15778 -74 -15779 0
 15776  15777  15778 -74 -15780 0
 15776  15777  15778 -74  15781 0

c  1+1 --> 2
c    (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0 ∧  p_74) -> (-b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0)
c  in CNF:
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_2
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨  b^{37, 3}_1
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ -p_74 ∨ -b^{37, 3}_0
c  in DIMACS:
 15776  15777 -15778 -74 -15779 0
 15776  15777 -15778 -74  15780 0
 15776  15777 -15778 -74 -15781 0

c  2+1 --> break 
c    (-b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧  p_74) -> break
c  in CNF:
c     b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ -p_74 ∨ break
c  in DIMACS:
 15776 -15777  15778 -74 1162 0


c  2-1 --> 1
c    (-b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧ -p_74) -> (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0)
c  in CNF:
c     b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_2
c     b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_1
c     b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨  b^{37, 3}_0
c  in DIMACS:
 15776 -15777  15778  74 -15779 0
 15776 -15777  15778  74 -15780 0
 15776 -15777  15778  74  15781 0

c  1-1 --> 0
c    (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0 ∧ -p_74) -> (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧ -b^{37, 3}_0)
c  in CNF:
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_2
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_1
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_0
c  in DIMACS:
 15776  15777 -15778  74 -15779 0
 15776  15777 -15778  74 -15780 0
 15776  15777 -15778  74 -15781 0

c  0-1 --> -1
c    (-b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧ -p_74) -> ( b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0)
c  in CNF:
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨  b^{37, 3}_2
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_1
c     b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨  b^{37, 3}_0
c  in DIMACS:
 15776  15777  15778  74  15779 0
 15776  15777  15778  74 -15780 0
 15776  15777  15778  74  15781 0

c  -1-1 --> -2
c    ( b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧  b^{37, 2}_0 ∧ -p_74) -> ( b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0)
c  in CNF:
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨  b^{37, 3}_2
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨  b^{37, 3}_1
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨  p_74 ∨ -b^{37, 3}_0
c  in DIMACS:
-15776  15777 -15778  74  15779 0
-15776  15777 -15778  74  15780 0
-15776  15777 -15778  74 -15781 0

c  -2-1 --> break 
c    ( b^{37, 2}_2 ∧  b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧ -p_74) -> break
c  in CNF:
c    -b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨  b^{37, 2}_0 ∨  p_74 ∨ break
c  in DIMACS:
-15776 -15777  15778  74 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 2}_2 ∧ -b^{37, 2}_1 ∧ -b^{37, 2}_0 ∧ true) 
c  in CNF:
c    -b^{37, 2}_2 ∨  b^{37, 2}_1 ∨  b^{37, 2}_0 ∨ false 
c  in DIMACS:
-15776  15777  15778  0

c  3 does not represent an automaton state.
c    -(-b^{37, 2}_2 ∧  b^{37, 2}_1 ∧  b^{37, 2}_0 ∧ true) 
c  in CNF:
c     b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ false 
c  in DIMACS:
 15776 -15777 -15778  0
c  -3 does not represent an automaton state.
c    -( b^{37, 2}_2 ∧  b^{37, 2}_1 ∧  b^{37, 2}_0 ∧ true) 
c  in CNF:
c    -b^{37, 2}_2 ∨ -b^{37, 2}_1 ∨ -b^{37, 2}_0 ∨ false 
c  in DIMACS:
-15776 -15777 -15778  0

c i = 3
c  -2+1 --> -1
c    ( b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧  p_111) -> ( b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0)
c  in CNF:
c    -b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨  b^{37, 4}_2
c    -b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_1
c    -b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨  b^{37, 4}_0
c  in DIMACS:
-15779 -15780  15781 -111  15782 0
-15779 -15780  15781 -111 -15783 0
-15779 -15780  15781 -111  15784 0

c  -1+1 --> 0
c    ( b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0 ∧  p_111) -> (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧ -b^{37, 4}_0)
c  in CNF:
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_2
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_1
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_0
c  in DIMACS:
-15779  15780 -15781 -111 -15782 0
-15779  15780 -15781 -111 -15783 0
-15779  15780 -15781 -111 -15784 0

c  0+1 --> 1
c    (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧  p_111) -> (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0)
c  in CNF:
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_2
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_1
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨  b^{37, 4}_0
c  in DIMACS:
 15779  15780  15781 -111 -15782 0
 15779  15780  15781 -111 -15783 0
 15779  15780  15781 -111  15784 0

c  1+1 --> 2
c    (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0 ∧  p_111) -> (-b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0)
c  in CNF:
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_2
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨  b^{37, 4}_1
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ -p_111 ∨ -b^{37, 4}_0
c  in DIMACS:
 15779  15780 -15781 -111 -15782 0
 15779  15780 -15781 -111  15783 0
 15779  15780 -15781 -111 -15784 0

c  2+1 --> break 
c    (-b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧  p_111) -> break
c  in CNF:
c     b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ -p_111 ∨ break
c  in DIMACS:
 15779 -15780  15781 -111 1162 0


c  2-1 --> 1
c    (-b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧ -p_111) -> (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0)
c  in CNF:
c     b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_2
c     b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_1
c     b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨  b^{37, 4}_0
c  in DIMACS:
 15779 -15780  15781  111 -15782 0
 15779 -15780  15781  111 -15783 0
 15779 -15780  15781  111  15784 0

c  1-1 --> 0
c    (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0 ∧ -p_111) -> (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧ -b^{37, 4}_0)
c  in CNF:
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_2
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_1
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_0
c  in DIMACS:
 15779  15780 -15781  111 -15782 0
 15779  15780 -15781  111 -15783 0
 15779  15780 -15781  111 -15784 0

c  0-1 --> -1
c    (-b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧ -p_111) -> ( b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0)
c  in CNF:
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨  b^{37, 4}_2
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_1
c     b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨  b^{37, 4}_0
c  in DIMACS:
 15779  15780  15781  111  15782 0
 15779  15780  15781  111 -15783 0
 15779  15780  15781  111  15784 0

c  -1-1 --> -2
c    ( b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧  b^{37, 3}_0 ∧ -p_111) -> ( b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0)
c  in CNF:
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨  b^{37, 4}_2
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨  b^{37, 4}_1
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨  p_111 ∨ -b^{37, 4}_0
c  in DIMACS:
-15779  15780 -15781  111  15782 0
-15779  15780 -15781  111  15783 0
-15779  15780 -15781  111 -15784 0

c  -2-1 --> break 
c    ( b^{37, 3}_2 ∧  b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧ -p_111) -> break
c  in CNF:
c    -b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨  b^{37, 3}_0 ∨  p_111 ∨ break
c  in DIMACS:
-15779 -15780  15781  111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 3}_2 ∧ -b^{37, 3}_1 ∧ -b^{37, 3}_0 ∧ true) 
c  in CNF:
c    -b^{37, 3}_2 ∨  b^{37, 3}_1 ∨  b^{37, 3}_0 ∨ false 
c  in DIMACS:
-15779  15780  15781  0

c  3 does not represent an automaton state.
c    -(-b^{37, 3}_2 ∧  b^{37, 3}_1 ∧  b^{37, 3}_0 ∧ true) 
c  in CNF:
c     b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ false 
c  in DIMACS:
 15779 -15780 -15781  0
c  -3 does not represent an automaton state.
c    -( b^{37, 3}_2 ∧  b^{37, 3}_1 ∧  b^{37, 3}_0 ∧ true) 
c  in CNF:
c    -b^{37, 3}_2 ∨ -b^{37, 3}_1 ∨ -b^{37, 3}_0 ∨ false 
c  in DIMACS:
-15779 -15780 -15781  0

c i = 4
c  -2+1 --> -1
c    ( b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧  p_148) -> ( b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0)
c  in CNF:
c    -b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨  b^{37, 5}_2
c    -b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_1
c    -b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨  b^{37, 5}_0
c  in DIMACS:
-15782 -15783  15784 -148  15785 0
-15782 -15783  15784 -148 -15786 0
-15782 -15783  15784 -148  15787 0

c  -1+1 --> 0
c    ( b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0 ∧  p_148) -> (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧ -b^{37, 5}_0)
c  in CNF:
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_2
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_1
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_0
c  in DIMACS:
-15782  15783 -15784 -148 -15785 0
-15782  15783 -15784 -148 -15786 0
-15782  15783 -15784 -148 -15787 0

c  0+1 --> 1
c    (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧  p_148) -> (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0)
c  in CNF:
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_2
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_1
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨  b^{37, 5}_0
c  in DIMACS:
 15782  15783  15784 -148 -15785 0
 15782  15783  15784 -148 -15786 0
 15782  15783  15784 -148  15787 0

c  1+1 --> 2
c    (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0 ∧  p_148) -> (-b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0)
c  in CNF:
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_2
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨  b^{37, 5}_1
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ -p_148 ∨ -b^{37, 5}_0
c  in DIMACS:
 15782  15783 -15784 -148 -15785 0
 15782  15783 -15784 -148  15786 0
 15782  15783 -15784 -148 -15787 0

c  2+1 --> break 
c    (-b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧  p_148) -> break
c  in CNF:
c     b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 15782 -15783  15784 -148 1162 0


c  2-1 --> 1
c    (-b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧ -p_148) -> (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0)
c  in CNF:
c     b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_2
c     b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_1
c     b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨  b^{37, 5}_0
c  in DIMACS:
 15782 -15783  15784  148 -15785 0
 15782 -15783  15784  148 -15786 0
 15782 -15783  15784  148  15787 0

c  1-1 --> 0
c    (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0 ∧ -p_148) -> (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧ -b^{37, 5}_0)
c  in CNF:
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_2
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_1
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_0
c  in DIMACS:
 15782  15783 -15784  148 -15785 0
 15782  15783 -15784  148 -15786 0
 15782  15783 -15784  148 -15787 0

c  0-1 --> -1
c    (-b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧ -p_148) -> ( b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0)
c  in CNF:
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨  b^{37, 5}_2
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_1
c     b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨  b^{37, 5}_0
c  in DIMACS:
 15782  15783  15784  148  15785 0
 15782  15783  15784  148 -15786 0
 15782  15783  15784  148  15787 0

c  -1-1 --> -2
c    ( b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧  b^{37, 4}_0 ∧ -p_148) -> ( b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0)
c  in CNF:
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨  b^{37, 5}_2
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨  b^{37, 5}_1
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨  p_148 ∨ -b^{37, 5}_0
c  in DIMACS:
-15782  15783 -15784  148  15785 0
-15782  15783 -15784  148  15786 0
-15782  15783 -15784  148 -15787 0

c  -2-1 --> break 
c    ( b^{37, 4}_2 ∧  b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨  b^{37, 4}_0 ∨  p_148 ∨ break
c  in DIMACS:
-15782 -15783  15784  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 4}_2 ∧ -b^{37, 4}_1 ∧ -b^{37, 4}_0 ∧ true) 
c  in CNF:
c    -b^{37, 4}_2 ∨  b^{37, 4}_1 ∨  b^{37, 4}_0 ∨ false 
c  in DIMACS:
-15782  15783  15784  0

c  3 does not represent an automaton state.
c    -(-b^{37, 4}_2 ∧  b^{37, 4}_1 ∧  b^{37, 4}_0 ∧ true) 
c  in CNF:
c     b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ false 
c  in DIMACS:
 15782 -15783 -15784  0
c  -3 does not represent an automaton state.
c    -( b^{37, 4}_2 ∧  b^{37, 4}_1 ∧  b^{37, 4}_0 ∧ true) 
c  in CNF:
c    -b^{37, 4}_2 ∨ -b^{37, 4}_1 ∨ -b^{37, 4}_0 ∨ false 
c  in DIMACS:
-15782 -15783 -15784  0

c i = 5
c  -2+1 --> -1
c    ( b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧  p_185) -> ( b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0)
c  in CNF:
c    -b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨  b^{37, 6}_2
c    -b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_1
c    -b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨  b^{37, 6}_0
c  in DIMACS:
-15785 -15786  15787 -185  15788 0
-15785 -15786  15787 -185 -15789 0
-15785 -15786  15787 -185  15790 0

c  -1+1 --> 0
c    ( b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0 ∧  p_185) -> (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧ -b^{37, 6}_0)
c  in CNF:
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_2
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_1
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_0
c  in DIMACS:
-15785  15786 -15787 -185 -15788 0
-15785  15786 -15787 -185 -15789 0
-15785  15786 -15787 -185 -15790 0

c  0+1 --> 1
c    (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧  p_185) -> (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0)
c  in CNF:
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_2
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_1
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨  b^{37, 6}_0
c  in DIMACS:
 15785  15786  15787 -185 -15788 0
 15785  15786  15787 -185 -15789 0
 15785  15786  15787 -185  15790 0

c  1+1 --> 2
c    (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0 ∧  p_185) -> (-b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0)
c  in CNF:
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_2
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨  b^{37, 6}_1
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ -p_185 ∨ -b^{37, 6}_0
c  in DIMACS:
 15785  15786 -15787 -185 -15788 0
 15785  15786 -15787 -185  15789 0
 15785  15786 -15787 -185 -15790 0

c  2+1 --> break 
c    (-b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧  p_185) -> break
c  in CNF:
c     b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ -p_185 ∨ break
c  in DIMACS:
 15785 -15786  15787 -185 1162 0


c  2-1 --> 1
c    (-b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧ -p_185) -> (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0)
c  in CNF:
c     b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_2
c     b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_1
c     b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨  b^{37, 6}_0
c  in DIMACS:
 15785 -15786  15787  185 -15788 0
 15785 -15786  15787  185 -15789 0
 15785 -15786  15787  185  15790 0

c  1-1 --> 0
c    (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0 ∧ -p_185) -> (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧ -b^{37, 6}_0)
c  in CNF:
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_2
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_1
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_0
c  in DIMACS:
 15785  15786 -15787  185 -15788 0
 15785  15786 -15787  185 -15789 0
 15785  15786 -15787  185 -15790 0

c  0-1 --> -1
c    (-b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧ -p_185) -> ( b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0)
c  in CNF:
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨  b^{37, 6}_2
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_1
c     b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨  b^{37, 6}_0
c  in DIMACS:
 15785  15786  15787  185  15788 0
 15785  15786  15787  185 -15789 0
 15785  15786  15787  185  15790 0

c  -1-1 --> -2
c    ( b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧  b^{37, 5}_0 ∧ -p_185) -> ( b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0)
c  in CNF:
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨  b^{37, 6}_2
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨  b^{37, 6}_1
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨  p_185 ∨ -b^{37, 6}_0
c  in DIMACS:
-15785  15786 -15787  185  15788 0
-15785  15786 -15787  185  15789 0
-15785  15786 -15787  185 -15790 0

c  -2-1 --> break 
c    ( b^{37, 5}_2 ∧  b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧ -p_185) -> break
c  in CNF:
c    -b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨  b^{37, 5}_0 ∨  p_185 ∨ break
c  in DIMACS:
-15785 -15786  15787  185 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 5}_2 ∧ -b^{37, 5}_1 ∧ -b^{37, 5}_0 ∧ true) 
c  in CNF:
c    -b^{37, 5}_2 ∨  b^{37, 5}_1 ∨  b^{37, 5}_0 ∨ false 
c  in DIMACS:
-15785  15786  15787  0

c  3 does not represent an automaton state.
c    -(-b^{37, 5}_2 ∧  b^{37, 5}_1 ∧  b^{37, 5}_0 ∧ true) 
c  in CNF:
c     b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ false 
c  in DIMACS:
 15785 -15786 -15787  0
c  -3 does not represent an automaton state.
c    -( b^{37, 5}_2 ∧  b^{37, 5}_1 ∧  b^{37, 5}_0 ∧ true) 
c  in CNF:
c    -b^{37, 5}_2 ∨ -b^{37, 5}_1 ∨ -b^{37, 5}_0 ∨ false 
c  in DIMACS:
-15785 -15786 -15787  0

c i = 6
c  -2+1 --> -1
c    ( b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧  p_222) -> ( b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0)
c  in CNF:
c    -b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨  b^{37, 7}_2
c    -b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_1
c    -b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨  b^{37, 7}_0
c  in DIMACS:
-15788 -15789  15790 -222  15791 0
-15788 -15789  15790 -222 -15792 0
-15788 -15789  15790 -222  15793 0

c  -1+1 --> 0
c    ( b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0 ∧  p_222) -> (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧ -b^{37, 7}_0)
c  in CNF:
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_2
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_1
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_0
c  in DIMACS:
-15788  15789 -15790 -222 -15791 0
-15788  15789 -15790 -222 -15792 0
-15788  15789 -15790 -222 -15793 0

c  0+1 --> 1
c    (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧  p_222) -> (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0)
c  in CNF:
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_2
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_1
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨  b^{37, 7}_0
c  in DIMACS:
 15788  15789  15790 -222 -15791 0
 15788  15789  15790 -222 -15792 0
 15788  15789  15790 -222  15793 0

c  1+1 --> 2
c    (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0 ∧  p_222) -> (-b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0)
c  in CNF:
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_2
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨  b^{37, 7}_1
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ -p_222 ∨ -b^{37, 7}_0
c  in DIMACS:
 15788  15789 -15790 -222 -15791 0
 15788  15789 -15790 -222  15792 0
 15788  15789 -15790 -222 -15793 0

c  2+1 --> break 
c    (-b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧  p_222) -> break
c  in CNF:
c     b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 15788 -15789  15790 -222 1162 0


c  2-1 --> 1
c    (-b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧ -p_222) -> (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0)
c  in CNF:
c     b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_2
c     b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_1
c     b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨  b^{37, 7}_0
c  in DIMACS:
 15788 -15789  15790  222 -15791 0
 15788 -15789  15790  222 -15792 0
 15788 -15789  15790  222  15793 0

c  1-1 --> 0
c    (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0 ∧ -p_222) -> (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧ -b^{37, 7}_0)
c  in CNF:
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_2
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_1
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_0
c  in DIMACS:
 15788  15789 -15790  222 -15791 0
 15788  15789 -15790  222 -15792 0
 15788  15789 -15790  222 -15793 0

c  0-1 --> -1
c    (-b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧ -p_222) -> ( b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0)
c  in CNF:
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨  b^{37, 7}_2
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_1
c     b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨  b^{37, 7}_0
c  in DIMACS:
 15788  15789  15790  222  15791 0
 15788  15789  15790  222 -15792 0
 15788  15789  15790  222  15793 0

c  -1-1 --> -2
c    ( b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧  b^{37, 6}_0 ∧ -p_222) -> ( b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0)
c  in CNF:
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨  b^{37, 7}_2
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨  b^{37, 7}_1
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨  p_222 ∨ -b^{37, 7}_0
c  in DIMACS:
-15788  15789 -15790  222  15791 0
-15788  15789 -15790  222  15792 0
-15788  15789 -15790  222 -15793 0

c  -2-1 --> break 
c    ( b^{37, 6}_2 ∧  b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨  b^{37, 6}_0 ∨  p_222 ∨ break
c  in DIMACS:
-15788 -15789  15790  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 6}_2 ∧ -b^{37, 6}_1 ∧ -b^{37, 6}_0 ∧ true) 
c  in CNF:
c    -b^{37, 6}_2 ∨  b^{37, 6}_1 ∨  b^{37, 6}_0 ∨ false 
c  in DIMACS:
-15788  15789  15790  0

c  3 does not represent an automaton state.
c    -(-b^{37, 6}_2 ∧  b^{37, 6}_1 ∧  b^{37, 6}_0 ∧ true) 
c  in CNF:
c     b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ false 
c  in DIMACS:
 15788 -15789 -15790  0
c  -3 does not represent an automaton state.
c    -( b^{37, 6}_2 ∧  b^{37, 6}_1 ∧  b^{37, 6}_0 ∧ true) 
c  in CNF:
c    -b^{37, 6}_2 ∨ -b^{37, 6}_1 ∨ -b^{37, 6}_0 ∨ false 
c  in DIMACS:
-15788 -15789 -15790  0

c i = 7
c  -2+1 --> -1
c    ( b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧  p_259) -> ( b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0)
c  in CNF:
c    -b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨  b^{37, 8}_2
c    -b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_1
c    -b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨  b^{37, 8}_0
c  in DIMACS:
-15791 -15792  15793 -259  15794 0
-15791 -15792  15793 -259 -15795 0
-15791 -15792  15793 -259  15796 0

c  -1+1 --> 0
c    ( b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0 ∧  p_259) -> (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧ -b^{37, 8}_0)
c  in CNF:
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_2
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_1
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_0
c  in DIMACS:
-15791  15792 -15793 -259 -15794 0
-15791  15792 -15793 -259 -15795 0
-15791  15792 -15793 -259 -15796 0

c  0+1 --> 1
c    (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧  p_259) -> (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0)
c  in CNF:
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_2
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_1
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨  b^{37, 8}_0
c  in DIMACS:
 15791  15792  15793 -259 -15794 0
 15791  15792  15793 -259 -15795 0
 15791  15792  15793 -259  15796 0

c  1+1 --> 2
c    (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0 ∧  p_259) -> (-b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0)
c  in CNF:
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_2
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨  b^{37, 8}_1
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ -p_259 ∨ -b^{37, 8}_0
c  in DIMACS:
 15791  15792 -15793 -259 -15794 0
 15791  15792 -15793 -259  15795 0
 15791  15792 -15793 -259 -15796 0

c  2+1 --> break 
c    (-b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧  p_259) -> break
c  in CNF:
c     b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ -p_259 ∨ break
c  in DIMACS:
 15791 -15792  15793 -259 1162 0


c  2-1 --> 1
c    (-b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧ -p_259) -> (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0)
c  in CNF:
c     b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_2
c     b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_1
c     b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨  b^{37, 8}_0
c  in DIMACS:
 15791 -15792  15793  259 -15794 0
 15791 -15792  15793  259 -15795 0
 15791 -15792  15793  259  15796 0

c  1-1 --> 0
c    (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0 ∧ -p_259) -> (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧ -b^{37, 8}_0)
c  in CNF:
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_2
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_1
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_0
c  in DIMACS:
 15791  15792 -15793  259 -15794 0
 15791  15792 -15793  259 -15795 0
 15791  15792 -15793  259 -15796 0

c  0-1 --> -1
c    (-b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧ -p_259) -> ( b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0)
c  in CNF:
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨  b^{37, 8}_2
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_1
c     b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨  b^{37, 8}_0
c  in DIMACS:
 15791  15792  15793  259  15794 0
 15791  15792  15793  259 -15795 0
 15791  15792  15793  259  15796 0

c  -1-1 --> -2
c    ( b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧  b^{37, 7}_0 ∧ -p_259) -> ( b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0)
c  in CNF:
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨  b^{37, 8}_2
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨  b^{37, 8}_1
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨  p_259 ∨ -b^{37, 8}_0
c  in DIMACS:
-15791  15792 -15793  259  15794 0
-15791  15792 -15793  259  15795 0
-15791  15792 -15793  259 -15796 0

c  -2-1 --> break 
c    ( b^{37, 7}_2 ∧  b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧ -p_259) -> break
c  in CNF:
c    -b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨  b^{37, 7}_0 ∨  p_259 ∨ break
c  in DIMACS:
-15791 -15792  15793  259 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 7}_2 ∧ -b^{37, 7}_1 ∧ -b^{37, 7}_0 ∧ true) 
c  in CNF:
c    -b^{37, 7}_2 ∨  b^{37, 7}_1 ∨  b^{37, 7}_0 ∨ false 
c  in DIMACS:
-15791  15792  15793  0

c  3 does not represent an automaton state.
c    -(-b^{37, 7}_2 ∧  b^{37, 7}_1 ∧  b^{37, 7}_0 ∧ true) 
c  in CNF:
c     b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ false 
c  in DIMACS:
 15791 -15792 -15793  0
c  -3 does not represent an automaton state.
c    -( b^{37, 7}_2 ∧  b^{37, 7}_1 ∧  b^{37, 7}_0 ∧ true) 
c  in CNF:
c    -b^{37, 7}_2 ∨ -b^{37, 7}_1 ∨ -b^{37, 7}_0 ∨ false 
c  in DIMACS:
-15791 -15792 -15793  0

c i = 8
c  -2+1 --> -1
c    ( b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧  p_296) -> ( b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0)
c  in CNF:
c    -b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨  b^{37, 9}_2
c    -b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_1
c    -b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨  b^{37, 9}_0
c  in DIMACS:
-15794 -15795  15796 -296  15797 0
-15794 -15795  15796 -296 -15798 0
-15794 -15795  15796 -296  15799 0

c  -1+1 --> 0
c    ( b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0 ∧  p_296) -> (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧ -b^{37, 9}_0)
c  in CNF:
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_2
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_1
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_0
c  in DIMACS:
-15794  15795 -15796 -296 -15797 0
-15794  15795 -15796 -296 -15798 0
-15794  15795 -15796 -296 -15799 0

c  0+1 --> 1
c    (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧  p_296) -> (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0)
c  in CNF:
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_2
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_1
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨  b^{37, 9}_0
c  in DIMACS:
 15794  15795  15796 -296 -15797 0
 15794  15795  15796 -296 -15798 0
 15794  15795  15796 -296  15799 0

c  1+1 --> 2
c    (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0 ∧  p_296) -> (-b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0)
c  in CNF:
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_2
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨  b^{37, 9}_1
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ -p_296 ∨ -b^{37, 9}_0
c  in DIMACS:
 15794  15795 -15796 -296 -15797 0
 15794  15795 -15796 -296  15798 0
 15794  15795 -15796 -296 -15799 0

c  2+1 --> break 
c    (-b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧  p_296) -> break
c  in CNF:
c     b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 15794 -15795  15796 -296 1162 0


c  2-1 --> 1
c    (-b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧ -p_296) -> (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0)
c  in CNF:
c     b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_2
c     b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_1
c     b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨  b^{37, 9}_0
c  in DIMACS:
 15794 -15795  15796  296 -15797 0
 15794 -15795  15796  296 -15798 0
 15794 -15795  15796  296  15799 0

c  1-1 --> 0
c    (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0 ∧ -p_296) -> (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧ -b^{37, 9}_0)
c  in CNF:
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_2
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_1
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_0
c  in DIMACS:
 15794  15795 -15796  296 -15797 0
 15794  15795 -15796  296 -15798 0
 15794  15795 -15796  296 -15799 0

c  0-1 --> -1
c    (-b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧ -p_296) -> ( b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0)
c  in CNF:
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨  b^{37, 9}_2
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_1
c     b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨  b^{37, 9}_0
c  in DIMACS:
 15794  15795  15796  296  15797 0
 15794  15795  15796  296 -15798 0
 15794  15795  15796  296  15799 0

c  -1-1 --> -2
c    ( b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧  b^{37, 8}_0 ∧ -p_296) -> ( b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0)
c  in CNF:
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨  b^{37, 9}_2
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨  b^{37, 9}_1
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨  p_296 ∨ -b^{37, 9}_0
c  in DIMACS:
-15794  15795 -15796  296  15797 0
-15794  15795 -15796  296  15798 0
-15794  15795 -15796  296 -15799 0

c  -2-1 --> break 
c    ( b^{37, 8}_2 ∧  b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨  b^{37, 8}_0 ∨  p_296 ∨ break
c  in DIMACS:
-15794 -15795  15796  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 8}_2 ∧ -b^{37, 8}_1 ∧ -b^{37, 8}_0 ∧ true) 
c  in CNF:
c    -b^{37, 8}_2 ∨  b^{37, 8}_1 ∨  b^{37, 8}_0 ∨ false 
c  in DIMACS:
-15794  15795  15796  0

c  3 does not represent an automaton state.
c    -(-b^{37, 8}_2 ∧  b^{37, 8}_1 ∧  b^{37, 8}_0 ∧ true) 
c  in CNF:
c     b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ false 
c  in DIMACS:
 15794 -15795 -15796  0
c  -3 does not represent an automaton state.
c    -( b^{37, 8}_2 ∧  b^{37, 8}_1 ∧  b^{37, 8}_0 ∧ true) 
c  in CNF:
c    -b^{37, 8}_2 ∨ -b^{37, 8}_1 ∨ -b^{37, 8}_0 ∨ false 
c  in DIMACS:
-15794 -15795 -15796  0

c i = 9
c  -2+1 --> -1
c    ( b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧  p_333) -> ( b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0)
c  in CNF:
c    -b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨  b^{37, 10}_2
c    -b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_1
c    -b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨  b^{37, 10}_0
c  in DIMACS:
-15797 -15798  15799 -333  15800 0
-15797 -15798  15799 -333 -15801 0
-15797 -15798  15799 -333  15802 0

c  -1+1 --> 0
c    ( b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0 ∧  p_333) -> (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧ -b^{37, 10}_0)
c  in CNF:
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_2
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_1
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_0
c  in DIMACS:
-15797  15798 -15799 -333 -15800 0
-15797  15798 -15799 -333 -15801 0
-15797  15798 -15799 -333 -15802 0

c  0+1 --> 1
c    (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧  p_333) -> (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0)
c  in CNF:
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_2
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_1
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨  b^{37, 10}_0
c  in DIMACS:
 15797  15798  15799 -333 -15800 0
 15797  15798  15799 -333 -15801 0
 15797  15798  15799 -333  15802 0

c  1+1 --> 2
c    (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0 ∧  p_333) -> (-b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0)
c  in CNF:
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_2
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨  b^{37, 10}_1
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ -p_333 ∨ -b^{37, 10}_0
c  in DIMACS:
 15797  15798 -15799 -333 -15800 0
 15797  15798 -15799 -333  15801 0
 15797  15798 -15799 -333 -15802 0

c  2+1 --> break 
c    (-b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧  p_333) -> break
c  in CNF:
c     b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 15797 -15798  15799 -333 1162 0


c  2-1 --> 1
c    (-b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧ -p_333) -> (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0)
c  in CNF:
c     b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_2
c     b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_1
c     b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨  b^{37, 10}_0
c  in DIMACS:
 15797 -15798  15799  333 -15800 0
 15797 -15798  15799  333 -15801 0
 15797 -15798  15799  333  15802 0

c  1-1 --> 0
c    (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0 ∧ -p_333) -> (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧ -b^{37, 10}_0)
c  in CNF:
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_2
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_1
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_0
c  in DIMACS:
 15797  15798 -15799  333 -15800 0
 15797  15798 -15799  333 -15801 0
 15797  15798 -15799  333 -15802 0

c  0-1 --> -1
c    (-b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧ -p_333) -> ( b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0)
c  in CNF:
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨  b^{37, 10}_2
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_1
c     b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨  b^{37, 10}_0
c  in DIMACS:
 15797  15798  15799  333  15800 0
 15797  15798  15799  333 -15801 0
 15797  15798  15799  333  15802 0

c  -1-1 --> -2
c    ( b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧  b^{37, 9}_0 ∧ -p_333) -> ( b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0)
c  in CNF:
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨  b^{37, 10}_2
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨  b^{37, 10}_1
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨  p_333 ∨ -b^{37, 10}_0
c  in DIMACS:
-15797  15798 -15799  333  15800 0
-15797  15798 -15799  333  15801 0
-15797  15798 -15799  333 -15802 0

c  -2-1 --> break 
c    ( b^{37, 9}_2 ∧  b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨  b^{37, 9}_0 ∨  p_333 ∨ break
c  in DIMACS:
-15797 -15798  15799  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 9}_2 ∧ -b^{37, 9}_1 ∧ -b^{37, 9}_0 ∧ true) 
c  in CNF:
c    -b^{37, 9}_2 ∨  b^{37, 9}_1 ∨  b^{37, 9}_0 ∨ false 
c  in DIMACS:
-15797  15798  15799  0

c  3 does not represent an automaton state.
c    -(-b^{37, 9}_2 ∧  b^{37, 9}_1 ∧  b^{37, 9}_0 ∧ true) 
c  in CNF:
c     b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ false 
c  in DIMACS:
 15797 -15798 -15799  0
c  -3 does not represent an automaton state.
c    -( b^{37, 9}_2 ∧  b^{37, 9}_1 ∧  b^{37, 9}_0 ∧ true) 
c  in CNF:
c    -b^{37, 9}_2 ∨ -b^{37, 9}_1 ∨ -b^{37, 9}_0 ∨ false 
c  in DIMACS:
-15797 -15798 -15799  0

c i = 10
c  -2+1 --> -1
c    ( b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧  p_370) -> ( b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0)
c  in CNF:
c    -b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨  b^{37, 11}_2
c    -b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_1
c    -b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨  b^{37, 11}_0
c  in DIMACS:
-15800 -15801  15802 -370  15803 0
-15800 -15801  15802 -370 -15804 0
-15800 -15801  15802 -370  15805 0

c  -1+1 --> 0
c    ( b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0 ∧  p_370) -> (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧ -b^{37, 11}_0)
c  in CNF:
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_2
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_1
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_0
c  in DIMACS:
-15800  15801 -15802 -370 -15803 0
-15800  15801 -15802 -370 -15804 0
-15800  15801 -15802 -370 -15805 0

c  0+1 --> 1
c    (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧  p_370) -> (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0)
c  in CNF:
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_2
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_1
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨  b^{37, 11}_0
c  in DIMACS:
 15800  15801  15802 -370 -15803 0
 15800  15801  15802 -370 -15804 0
 15800  15801  15802 -370  15805 0

c  1+1 --> 2
c    (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0 ∧  p_370) -> (-b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0)
c  in CNF:
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_2
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨  b^{37, 11}_1
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ -p_370 ∨ -b^{37, 11}_0
c  in DIMACS:
 15800  15801 -15802 -370 -15803 0
 15800  15801 -15802 -370  15804 0
 15800  15801 -15802 -370 -15805 0

c  2+1 --> break 
c    (-b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧  p_370) -> break
c  in CNF:
c     b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 15800 -15801  15802 -370 1162 0


c  2-1 --> 1
c    (-b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧ -p_370) -> (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0)
c  in CNF:
c     b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_2
c     b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_1
c     b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨  b^{37, 11}_0
c  in DIMACS:
 15800 -15801  15802  370 -15803 0
 15800 -15801  15802  370 -15804 0
 15800 -15801  15802  370  15805 0

c  1-1 --> 0
c    (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0 ∧ -p_370) -> (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧ -b^{37, 11}_0)
c  in CNF:
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_2
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_1
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_0
c  in DIMACS:
 15800  15801 -15802  370 -15803 0
 15800  15801 -15802  370 -15804 0
 15800  15801 -15802  370 -15805 0

c  0-1 --> -1
c    (-b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧ -p_370) -> ( b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0)
c  in CNF:
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨  b^{37, 11}_2
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_1
c     b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨  b^{37, 11}_0
c  in DIMACS:
 15800  15801  15802  370  15803 0
 15800  15801  15802  370 -15804 0
 15800  15801  15802  370  15805 0

c  -1-1 --> -2
c    ( b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧  b^{37, 10}_0 ∧ -p_370) -> ( b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0)
c  in CNF:
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨  b^{37, 11}_2
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨  b^{37, 11}_1
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨  p_370 ∨ -b^{37, 11}_0
c  in DIMACS:
-15800  15801 -15802  370  15803 0
-15800  15801 -15802  370  15804 0
-15800  15801 -15802  370 -15805 0

c  -2-1 --> break 
c    ( b^{37, 10}_2 ∧  b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨  b^{37, 10}_0 ∨  p_370 ∨ break
c  in DIMACS:
-15800 -15801  15802  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 10}_2 ∧ -b^{37, 10}_1 ∧ -b^{37, 10}_0 ∧ true) 
c  in CNF:
c    -b^{37, 10}_2 ∨  b^{37, 10}_1 ∨  b^{37, 10}_0 ∨ false 
c  in DIMACS:
-15800  15801  15802  0

c  3 does not represent an automaton state.
c    -(-b^{37, 10}_2 ∧  b^{37, 10}_1 ∧  b^{37, 10}_0 ∧ true) 
c  in CNF:
c     b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ false 
c  in DIMACS:
 15800 -15801 -15802  0
c  -3 does not represent an automaton state.
c    -( b^{37, 10}_2 ∧  b^{37, 10}_1 ∧  b^{37, 10}_0 ∧ true) 
c  in CNF:
c    -b^{37, 10}_2 ∨ -b^{37, 10}_1 ∨ -b^{37, 10}_0 ∨ false 
c  in DIMACS:
-15800 -15801 -15802  0

c i = 11
c  -2+1 --> -1
c    ( b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧  p_407) -> ( b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0)
c  in CNF:
c    -b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨  b^{37, 12}_2
c    -b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_1
c    -b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨  b^{37, 12}_0
c  in DIMACS:
-15803 -15804  15805 -407  15806 0
-15803 -15804  15805 -407 -15807 0
-15803 -15804  15805 -407  15808 0

c  -1+1 --> 0
c    ( b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0 ∧  p_407) -> (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧ -b^{37, 12}_0)
c  in CNF:
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_2
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_1
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_0
c  in DIMACS:
-15803  15804 -15805 -407 -15806 0
-15803  15804 -15805 -407 -15807 0
-15803  15804 -15805 -407 -15808 0

c  0+1 --> 1
c    (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧  p_407) -> (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0)
c  in CNF:
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_2
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_1
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨  b^{37, 12}_0
c  in DIMACS:
 15803  15804  15805 -407 -15806 0
 15803  15804  15805 -407 -15807 0
 15803  15804  15805 -407  15808 0

c  1+1 --> 2
c    (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0 ∧  p_407) -> (-b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0)
c  in CNF:
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_2
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨  b^{37, 12}_1
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ -p_407 ∨ -b^{37, 12}_0
c  in DIMACS:
 15803  15804 -15805 -407 -15806 0
 15803  15804 -15805 -407  15807 0
 15803  15804 -15805 -407 -15808 0

c  2+1 --> break 
c    (-b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧  p_407) -> break
c  in CNF:
c     b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ -p_407 ∨ break
c  in DIMACS:
 15803 -15804  15805 -407 1162 0


c  2-1 --> 1
c    (-b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧ -p_407) -> (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0)
c  in CNF:
c     b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_2
c     b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_1
c     b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨  b^{37, 12}_0
c  in DIMACS:
 15803 -15804  15805  407 -15806 0
 15803 -15804  15805  407 -15807 0
 15803 -15804  15805  407  15808 0

c  1-1 --> 0
c    (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0 ∧ -p_407) -> (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧ -b^{37, 12}_0)
c  in CNF:
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_2
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_1
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_0
c  in DIMACS:
 15803  15804 -15805  407 -15806 0
 15803  15804 -15805  407 -15807 0
 15803  15804 -15805  407 -15808 0

c  0-1 --> -1
c    (-b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧ -p_407) -> ( b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0)
c  in CNF:
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨  b^{37, 12}_2
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_1
c     b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨  b^{37, 12}_0
c  in DIMACS:
 15803  15804  15805  407  15806 0
 15803  15804  15805  407 -15807 0
 15803  15804  15805  407  15808 0

c  -1-1 --> -2
c    ( b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧  b^{37, 11}_0 ∧ -p_407) -> ( b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0)
c  in CNF:
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨  b^{37, 12}_2
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨  b^{37, 12}_1
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨  p_407 ∨ -b^{37, 12}_0
c  in DIMACS:
-15803  15804 -15805  407  15806 0
-15803  15804 -15805  407  15807 0
-15803  15804 -15805  407 -15808 0

c  -2-1 --> break 
c    ( b^{37, 11}_2 ∧  b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧ -p_407) -> break
c  in CNF:
c    -b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨  b^{37, 11}_0 ∨  p_407 ∨ break
c  in DIMACS:
-15803 -15804  15805  407 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 11}_2 ∧ -b^{37, 11}_1 ∧ -b^{37, 11}_0 ∧ true) 
c  in CNF:
c    -b^{37, 11}_2 ∨  b^{37, 11}_1 ∨  b^{37, 11}_0 ∨ false 
c  in DIMACS:
-15803  15804  15805  0

c  3 does not represent an automaton state.
c    -(-b^{37, 11}_2 ∧  b^{37, 11}_1 ∧  b^{37, 11}_0 ∧ true) 
c  in CNF:
c     b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ false 
c  in DIMACS:
 15803 -15804 -15805  0
c  -3 does not represent an automaton state.
c    -( b^{37, 11}_2 ∧  b^{37, 11}_1 ∧  b^{37, 11}_0 ∧ true) 
c  in CNF:
c    -b^{37, 11}_2 ∨ -b^{37, 11}_1 ∨ -b^{37, 11}_0 ∨ false 
c  in DIMACS:
-15803 -15804 -15805  0

c i = 12
c  -2+1 --> -1
c    ( b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧  p_444) -> ( b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0)
c  in CNF:
c    -b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨  b^{37, 13}_2
c    -b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_1
c    -b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨  b^{37, 13}_0
c  in DIMACS:
-15806 -15807  15808 -444  15809 0
-15806 -15807  15808 -444 -15810 0
-15806 -15807  15808 -444  15811 0

c  -1+1 --> 0
c    ( b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0 ∧  p_444) -> (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧ -b^{37, 13}_0)
c  in CNF:
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_2
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_1
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_0
c  in DIMACS:
-15806  15807 -15808 -444 -15809 0
-15806  15807 -15808 -444 -15810 0
-15806  15807 -15808 -444 -15811 0

c  0+1 --> 1
c    (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧  p_444) -> (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0)
c  in CNF:
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_2
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_1
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨  b^{37, 13}_0
c  in DIMACS:
 15806  15807  15808 -444 -15809 0
 15806  15807  15808 -444 -15810 0
 15806  15807  15808 -444  15811 0

c  1+1 --> 2
c    (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0 ∧  p_444) -> (-b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0)
c  in CNF:
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_2
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨  b^{37, 13}_1
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ -p_444 ∨ -b^{37, 13}_0
c  in DIMACS:
 15806  15807 -15808 -444 -15809 0
 15806  15807 -15808 -444  15810 0
 15806  15807 -15808 -444 -15811 0

c  2+1 --> break 
c    (-b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧  p_444) -> break
c  in CNF:
c     b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 15806 -15807  15808 -444 1162 0


c  2-1 --> 1
c    (-b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧ -p_444) -> (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0)
c  in CNF:
c     b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_2
c     b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_1
c     b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨  b^{37, 13}_0
c  in DIMACS:
 15806 -15807  15808  444 -15809 0
 15806 -15807  15808  444 -15810 0
 15806 -15807  15808  444  15811 0

c  1-1 --> 0
c    (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0 ∧ -p_444) -> (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧ -b^{37, 13}_0)
c  in CNF:
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_2
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_1
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_0
c  in DIMACS:
 15806  15807 -15808  444 -15809 0
 15806  15807 -15808  444 -15810 0
 15806  15807 -15808  444 -15811 0

c  0-1 --> -1
c    (-b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧ -p_444) -> ( b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0)
c  in CNF:
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨  b^{37, 13}_2
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_1
c     b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨  b^{37, 13}_0
c  in DIMACS:
 15806  15807  15808  444  15809 0
 15806  15807  15808  444 -15810 0
 15806  15807  15808  444  15811 0

c  -1-1 --> -2
c    ( b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧  b^{37, 12}_0 ∧ -p_444) -> ( b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0)
c  in CNF:
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨  b^{37, 13}_2
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨  b^{37, 13}_1
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨  p_444 ∨ -b^{37, 13}_0
c  in DIMACS:
-15806  15807 -15808  444  15809 0
-15806  15807 -15808  444  15810 0
-15806  15807 -15808  444 -15811 0

c  -2-1 --> break 
c    ( b^{37, 12}_2 ∧  b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨  b^{37, 12}_0 ∨  p_444 ∨ break
c  in DIMACS:
-15806 -15807  15808  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 12}_2 ∧ -b^{37, 12}_1 ∧ -b^{37, 12}_0 ∧ true) 
c  in CNF:
c    -b^{37, 12}_2 ∨  b^{37, 12}_1 ∨  b^{37, 12}_0 ∨ false 
c  in DIMACS:
-15806  15807  15808  0

c  3 does not represent an automaton state.
c    -(-b^{37, 12}_2 ∧  b^{37, 12}_1 ∧  b^{37, 12}_0 ∧ true) 
c  in CNF:
c     b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ false 
c  in DIMACS:
 15806 -15807 -15808  0
c  -3 does not represent an automaton state.
c    -( b^{37, 12}_2 ∧  b^{37, 12}_1 ∧  b^{37, 12}_0 ∧ true) 
c  in CNF:
c    -b^{37, 12}_2 ∨ -b^{37, 12}_1 ∨ -b^{37, 12}_0 ∨ false 
c  in DIMACS:
-15806 -15807 -15808  0

c i = 13
c  -2+1 --> -1
c    ( b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧  p_481) -> ( b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0)
c  in CNF:
c    -b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨  b^{37, 14}_2
c    -b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_1
c    -b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨  b^{37, 14}_0
c  in DIMACS:
-15809 -15810  15811 -481  15812 0
-15809 -15810  15811 -481 -15813 0
-15809 -15810  15811 -481  15814 0

c  -1+1 --> 0
c    ( b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0 ∧  p_481) -> (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧ -b^{37, 14}_0)
c  in CNF:
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_2
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_1
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_0
c  in DIMACS:
-15809  15810 -15811 -481 -15812 0
-15809  15810 -15811 -481 -15813 0
-15809  15810 -15811 -481 -15814 0

c  0+1 --> 1
c    (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧  p_481) -> (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0)
c  in CNF:
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_2
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_1
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨  b^{37, 14}_0
c  in DIMACS:
 15809  15810  15811 -481 -15812 0
 15809  15810  15811 -481 -15813 0
 15809  15810  15811 -481  15814 0

c  1+1 --> 2
c    (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0 ∧  p_481) -> (-b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0)
c  in CNF:
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_2
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨  b^{37, 14}_1
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ -p_481 ∨ -b^{37, 14}_0
c  in DIMACS:
 15809  15810 -15811 -481 -15812 0
 15809  15810 -15811 -481  15813 0
 15809  15810 -15811 -481 -15814 0

c  2+1 --> break 
c    (-b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧  p_481) -> break
c  in CNF:
c     b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ -p_481 ∨ break
c  in DIMACS:
 15809 -15810  15811 -481 1162 0


c  2-1 --> 1
c    (-b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧ -p_481) -> (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0)
c  in CNF:
c     b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_2
c     b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_1
c     b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨  b^{37, 14}_0
c  in DIMACS:
 15809 -15810  15811  481 -15812 0
 15809 -15810  15811  481 -15813 0
 15809 -15810  15811  481  15814 0

c  1-1 --> 0
c    (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0 ∧ -p_481) -> (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧ -b^{37, 14}_0)
c  in CNF:
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_2
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_1
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_0
c  in DIMACS:
 15809  15810 -15811  481 -15812 0
 15809  15810 -15811  481 -15813 0
 15809  15810 -15811  481 -15814 0

c  0-1 --> -1
c    (-b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧ -p_481) -> ( b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0)
c  in CNF:
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨  b^{37, 14}_2
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_1
c     b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨  b^{37, 14}_0
c  in DIMACS:
 15809  15810  15811  481  15812 0
 15809  15810  15811  481 -15813 0
 15809  15810  15811  481  15814 0

c  -1-1 --> -2
c    ( b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧  b^{37, 13}_0 ∧ -p_481) -> ( b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0)
c  in CNF:
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨  b^{37, 14}_2
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨  b^{37, 14}_1
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨  p_481 ∨ -b^{37, 14}_0
c  in DIMACS:
-15809  15810 -15811  481  15812 0
-15809  15810 -15811  481  15813 0
-15809  15810 -15811  481 -15814 0

c  -2-1 --> break 
c    ( b^{37, 13}_2 ∧  b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧ -p_481) -> break
c  in CNF:
c    -b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨  b^{37, 13}_0 ∨  p_481 ∨ break
c  in DIMACS:
-15809 -15810  15811  481 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 13}_2 ∧ -b^{37, 13}_1 ∧ -b^{37, 13}_0 ∧ true) 
c  in CNF:
c    -b^{37, 13}_2 ∨  b^{37, 13}_1 ∨  b^{37, 13}_0 ∨ false 
c  in DIMACS:
-15809  15810  15811  0

c  3 does not represent an automaton state.
c    -(-b^{37, 13}_2 ∧  b^{37, 13}_1 ∧  b^{37, 13}_0 ∧ true) 
c  in CNF:
c     b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ false 
c  in DIMACS:
 15809 -15810 -15811  0
c  -3 does not represent an automaton state.
c    -( b^{37, 13}_2 ∧  b^{37, 13}_1 ∧  b^{37, 13}_0 ∧ true) 
c  in CNF:
c    -b^{37, 13}_2 ∨ -b^{37, 13}_1 ∨ -b^{37, 13}_0 ∨ false 
c  in DIMACS:
-15809 -15810 -15811  0

c i = 14
c  -2+1 --> -1
c    ( b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧  p_518) -> ( b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0)
c  in CNF:
c    -b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨  b^{37, 15}_2
c    -b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_1
c    -b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨  b^{37, 15}_0
c  in DIMACS:
-15812 -15813  15814 -518  15815 0
-15812 -15813  15814 -518 -15816 0
-15812 -15813  15814 -518  15817 0

c  -1+1 --> 0
c    ( b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0 ∧  p_518) -> (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧ -b^{37, 15}_0)
c  in CNF:
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_2
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_1
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_0
c  in DIMACS:
-15812  15813 -15814 -518 -15815 0
-15812  15813 -15814 -518 -15816 0
-15812  15813 -15814 -518 -15817 0

c  0+1 --> 1
c    (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧  p_518) -> (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0)
c  in CNF:
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_2
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_1
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨  b^{37, 15}_0
c  in DIMACS:
 15812  15813  15814 -518 -15815 0
 15812  15813  15814 -518 -15816 0
 15812  15813  15814 -518  15817 0

c  1+1 --> 2
c    (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0 ∧  p_518) -> (-b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0)
c  in CNF:
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_2
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨  b^{37, 15}_1
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ -p_518 ∨ -b^{37, 15}_0
c  in DIMACS:
 15812  15813 -15814 -518 -15815 0
 15812  15813 -15814 -518  15816 0
 15812  15813 -15814 -518 -15817 0

c  2+1 --> break 
c    (-b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧  p_518) -> break
c  in CNF:
c     b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 15812 -15813  15814 -518 1162 0


c  2-1 --> 1
c    (-b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧ -p_518) -> (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0)
c  in CNF:
c     b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_2
c     b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_1
c     b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨  b^{37, 15}_0
c  in DIMACS:
 15812 -15813  15814  518 -15815 0
 15812 -15813  15814  518 -15816 0
 15812 -15813  15814  518  15817 0

c  1-1 --> 0
c    (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0 ∧ -p_518) -> (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧ -b^{37, 15}_0)
c  in CNF:
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_2
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_1
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_0
c  in DIMACS:
 15812  15813 -15814  518 -15815 0
 15812  15813 -15814  518 -15816 0
 15812  15813 -15814  518 -15817 0

c  0-1 --> -1
c    (-b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧ -p_518) -> ( b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0)
c  in CNF:
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨  b^{37, 15}_2
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_1
c     b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨  b^{37, 15}_0
c  in DIMACS:
 15812  15813  15814  518  15815 0
 15812  15813  15814  518 -15816 0
 15812  15813  15814  518  15817 0

c  -1-1 --> -2
c    ( b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧  b^{37, 14}_0 ∧ -p_518) -> ( b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0)
c  in CNF:
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨  b^{37, 15}_2
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨  b^{37, 15}_1
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨  p_518 ∨ -b^{37, 15}_0
c  in DIMACS:
-15812  15813 -15814  518  15815 0
-15812  15813 -15814  518  15816 0
-15812  15813 -15814  518 -15817 0

c  -2-1 --> break 
c    ( b^{37, 14}_2 ∧  b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨  b^{37, 14}_0 ∨  p_518 ∨ break
c  in DIMACS:
-15812 -15813  15814  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 14}_2 ∧ -b^{37, 14}_1 ∧ -b^{37, 14}_0 ∧ true) 
c  in CNF:
c    -b^{37, 14}_2 ∨  b^{37, 14}_1 ∨  b^{37, 14}_0 ∨ false 
c  in DIMACS:
-15812  15813  15814  0

c  3 does not represent an automaton state.
c    -(-b^{37, 14}_2 ∧  b^{37, 14}_1 ∧  b^{37, 14}_0 ∧ true) 
c  in CNF:
c     b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ false 
c  in DIMACS:
 15812 -15813 -15814  0
c  -3 does not represent an automaton state.
c    -( b^{37, 14}_2 ∧  b^{37, 14}_1 ∧  b^{37, 14}_0 ∧ true) 
c  in CNF:
c    -b^{37, 14}_2 ∨ -b^{37, 14}_1 ∨ -b^{37, 14}_0 ∨ false 
c  in DIMACS:
-15812 -15813 -15814  0

c i = 15
c  -2+1 --> -1
c    ( b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧  p_555) -> ( b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0)
c  in CNF:
c    -b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨  b^{37, 16}_2
c    -b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_1
c    -b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨  b^{37, 16}_0
c  in DIMACS:
-15815 -15816  15817 -555  15818 0
-15815 -15816  15817 -555 -15819 0
-15815 -15816  15817 -555  15820 0

c  -1+1 --> 0
c    ( b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0 ∧  p_555) -> (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧ -b^{37, 16}_0)
c  in CNF:
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_2
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_1
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_0
c  in DIMACS:
-15815  15816 -15817 -555 -15818 0
-15815  15816 -15817 -555 -15819 0
-15815  15816 -15817 -555 -15820 0

c  0+1 --> 1
c    (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧  p_555) -> (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0)
c  in CNF:
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_2
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_1
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨  b^{37, 16}_0
c  in DIMACS:
 15815  15816  15817 -555 -15818 0
 15815  15816  15817 -555 -15819 0
 15815  15816  15817 -555  15820 0

c  1+1 --> 2
c    (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0 ∧  p_555) -> (-b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0)
c  in CNF:
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_2
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨  b^{37, 16}_1
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ -p_555 ∨ -b^{37, 16}_0
c  in DIMACS:
 15815  15816 -15817 -555 -15818 0
 15815  15816 -15817 -555  15819 0
 15815  15816 -15817 -555 -15820 0

c  2+1 --> break 
c    (-b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧  p_555) -> break
c  in CNF:
c     b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 15815 -15816  15817 -555 1162 0


c  2-1 --> 1
c    (-b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧ -p_555) -> (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0)
c  in CNF:
c     b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_2
c     b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_1
c     b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨  b^{37, 16}_0
c  in DIMACS:
 15815 -15816  15817  555 -15818 0
 15815 -15816  15817  555 -15819 0
 15815 -15816  15817  555  15820 0

c  1-1 --> 0
c    (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0 ∧ -p_555) -> (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧ -b^{37, 16}_0)
c  in CNF:
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_2
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_1
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_0
c  in DIMACS:
 15815  15816 -15817  555 -15818 0
 15815  15816 -15817  555 -15819 0
 15815  15816 -15817  555 -15820 0

c  0-1 --> -1
c    (-b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧ -p_555) -> ( b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0)
c  in CNF:
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨  b^{37, 16}_2
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_1
c     b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨  b^{37, 16}_0
c  in DIMACS:
 15815  15816  15817  555  15818 0
 15815  15816  15817  555 -15819 0
 15815  15816  15817  555  15820 0

c  -1-1 --> -2
c    ( b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧  b^{37, 15}_0 ∧ -p_555) -> ( b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0)
c  in CNF:
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨  b^{37, 16}_2
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨  b^{37, 16}_1
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨  p_555 ∨ -b^{37, 16}_0
c  in DIMACS:
-15815  15816 -15817  555  15818 0
-15815  15816 -15817  555  15819 0
-15815  15816 -15817  555 -15820 0

c  -2-1 --> break 
c    ( b^{37, 15}_2 ∧  b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨  b^{37, 15}_0 ∨  p_555 ∨ break
c  in DIMACS:
-15815 -15816  15817  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 15}_2 ∧ -b^{37, 15}_1 ∧ -b^{37, 15}_0 ∧ true) 
c  in CNF:
c    -b^{37, 15}_2 ∨  b^{37, 15}_1 ∨  b^{37, 15}_0 ∨ false 
c  in DIMACS:
-15815  15816  15817  0

c  3 does not represent an automaton state.
c    -(-b^{37, 15}_2 ∧  b^{37, 15}_1 ∧  b^{37, 15}_0 ∧ true) 
c  in CNF:
c     b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ false 
c  in DIMACS:
 15815 -15816 -15817  0
c  -3 does not represent an automaton state.
c    -( b^{37, 15}_2 ∧  b^{37, 15}_1 ∧  b^{37, 15}_0 ∧ true) 
c  in CNF:
c    -b^{37, 15}_2 ∨ -b^{37, 15}_1 ∨ -b^{37, 15}_0 ∨ false 
c  in DIMACS:
-15815 -15816 -15817  0

c i = 16
c  -2+1 --> -1
c    ( b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧  p_592) -> ( b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0)
c  in CNF:
c    -b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨  b^{37, 17}_2
c    -b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_1
c    -b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨  b^{37, 17}_0
c  in DIMACS:
-15818 -15819  15820 -592  15821 0
-15818 -15819  15820 -592 -15822 0
-15818 -15819  15820 -592  15823 0

c  -1+1 --> 0
c    ( b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0 ∧  p_592) -> (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧ -b^{37, 17}_0)
c  in CNF:
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_2
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_1
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_0
c  in DIMACS:
-15818  15819 -15820 -592 -15821 0
-15818  15819 -15820 -592 -15822 0
-15818  15819 -15820 -592 -15823 0

c  0+1 --> 1
c    (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧  p_592) -> (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0)
c  in CNF:
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_2
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_1
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨  b^{37, 17}_0
c  in DIMACS:
 15818  15819  15820 -592 -15821 0
 15818  15819  15820 -592 -15822 0
 15818  15819  15820 -592  15823 0

c  1+1 --> 2
c    (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0 ∧  p_592) -> (-b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0)
c  in CNF:
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_2
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨  b^{37, 17}_1
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ -p_592 ∨ -b^{37, 17}_0
c  in DIMACS:
 15818  15819 -15820 -592 -15821 0
 15818  15819 -15820 -592  15822 0
 15818  15819 -15820 -592 -15823 0

c  2+1 --> break 
c    (-b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧  p_592) -> break
c  in CNF:
c     b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 15818 -15819  15820 -592 1162 0


c  2-1 --> 1
c    (-b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧ -p_592) -> (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0)
c  in CNF:
c     b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_2
c     b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_1
c     b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨  b^{37, 17}_0
c  in DIMACS:
 15818 -15819  15820  592 -15821 0
 15818 -15819  15820  592 -15822 0
 15818 -15819  15820  592  15823 0

c  1-1 --> 0
c    (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0 ∧ -p_592) -> (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧ -b^{37, 17}_0)
c  in CNF:
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_2
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_1
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_0
c  in DIMACS:
 15818  15819 -15820  592 -15821 0
 15818  15819 -15820  592 -15822 0
 15818  15819 -15820  592 -15823 0

c  0-1 --> -1
c    (-b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧ -p_592) -> ( b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0)
c  in CNF:
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨  b^{37, 17}_2
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_1
c     b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨  b^{37, 17}_0
c  in DIMACS:
 15818  15819  15820  592  15821 0
 15818  15819  15820  592 -15822 0
 15818  15819  15820  592  15823 0

c  -1-1 --> -2
c    ( b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧  b^{37, 16}_0 ∧ -p_592) -> ( b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0)
c  in CNF:
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨  b^{37, 17}_2
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨  b^{37, 17}_1
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨  p_592 ∨ -b^{37, 17}_0
c  in DIMACS:
-15818  15819 -15820  592  15821 0
-15818  15819 -15820  592  15822 0
-15818  15819 -15820  592 -15823 0

c  -2-1 --> break 
c    ( b^{37, 16}_2 ∧  b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨  b^{37, 16}_0 ∨  p_592 ∨ break
c  in DIMACS:
-15818 -15819  15820  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 16}_2 ∧ -b^{37, 16}_1 ∧ -b^{37, 16}_0 ∧ true) 
c  in CNF:
c    -b^{37, 16}_2 ∨  b^{37, 16}_1 ∨  b^{37, 16}_0 ∨ false 
c  in DIMACS:
-15818  15819  15820  0

c  3 does not represent an automaton state.
c    -(-b^{37, 16}_2 ∧  b^{37, 16}_1 ∧  b^{37, 16}_0 ∧ true) 
c  in CNF:
c     b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ false 
c  in DIMACS:
 15818 -15819 -15820  0
c  -3 does not represent an automaton state.
c    -( b^{37, 16}_2 ∧  b^{37, 16}_1 ∧  b^{37, 16}_0 ∧ true) 
c  in CNF:
c    -b^{37, 16}_2 ∨ -b^{37, 16}_1 ∨ -b^{37, 16}_0 ∨ false 
c  in DIMACS:
-15818 -15819 -15820  0

c i = 17
c  -2+1 --> -1
c    ( b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧  p_629) -> ( b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0)
c  in CNF:
c    -b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨  b^{37, 18}_2
c    -b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_1
c    -b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨  b^{37, 18}_0
c  in DIMACS:
-15821 -15822  15823 -629  15824 0
-15821 -15822  15823 -629 -15825 0
-15821 -15822  15823 -629  15826 0

c  -1+1 --> 0
c    ( b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0 ∧  p_629) -> (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧ -b^{37, 18}_0)
c  in CNF:
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_2
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_1
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_0
c  in DIMACS:
-15821  15822 -15823 -629 -15824 0
-15821  15822 -15823 -629 -15825 0
-15821  15822 -15823 -629 -15826 0

c  0+1 --> 1
c    (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧  p_629) -> (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0)
c  in CNF:
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_2
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_1
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨  b^{37, 18}_0
c  in DIMACS:
 15821  15822  15823 -629 -15824 0
 15821  15822  15823 -629 -15825 0
 15821  15822  15823 -629  15826 0

c  1+1 --> 2
c    (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0 ∧  p_629) -> (-b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0)
c  in CNF:
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_2
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨  b^{37, 18}_1
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ -p_629 ∨ -b^{37, 18}_0
c  in DIMACS:
 15821  15822 -15823 -629 -15824 0
 15821  15822 -15823 -629  15825 0
 15821  15822 -15823 -629 -15826 0

c  2+1 --> break 
c    (-b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧  p_629) -> break
c  in CNF:
c     b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ -p_629 ∨ break
c  in DIMACS:
 15821 -15822  15823 -629 1162 0


c  2-1 --> 1
c    (-b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧ -p_629) -> (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0)
c  in CNF:
c     b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_2
c     b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_1
c     b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨  b^{37, 18}_0
c  in DIMACS:
 15821 -15822  15823  629 -15824 0
 15821 -15822  15823  629 -15825 0
 15821 -15822  15823  629  15826 0

c  1-1 --> 0
c    (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0 ∧ -p_629) -> (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧ -b^{37, 18}_0)
c  in CNF:
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_2
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_1
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_0
c  in DIMACS:
 15821  15822 -15823  629 -15824 0
 15821  15822 -15823  629 -15825 0
 15821  15822 -15823  629 -15826 0

c  0-1 --> -1
c    (-b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧ -p_629) -> ( b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0)
c  in CNF:
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨  b^{37, 18}_2
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_1
c     b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨  b^{37, 18}_0
c  in DIMACS:
 15821  15822  15823  629  15824 0
 15821  15822  15823  629 -15825 0
 15821  15822  15823  629  15826 0

c  -1-1 --> -2
c    ( b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧  b^{37, 17}_0 ∧ -p_629) -> ( b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0)
c  in CNF:
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨  b^{37, 18}_2
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨  b^{37, 18}_1
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨  p_629 ∨ -b^{37, 18}_0
c  in DIMACS:
-15821  15822 -15823  629  15824 0
-15821  15822 -15823  629  15825 0
-15821  15822 -15823  629 -15826 0

c  -2-1 --> break 
c    ( b^{37, 17}_2 ∧  b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧ -p_629) -> break
c  in CNF:
c    -b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨  b^{37, 17}_0 ∨  p_629 ∨ break
c  in DIMACS:
-15821 -15822  15823  629 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 17}_2 ∧ -b^{37, 17}_1 ∧ -b^{37, 17}_0 ∧ true) 
c  in CNF:
c    -b^{37, 17}_2 ∨  b^{37, 17}_1 ∨  b^{37, 17}_0 ∨ false 
c  in DIMACS:
-15821  15822  15823  0

c  3 does not represent an automaton state.
c    -(-b^{37, 17}_2 ∧  b^{37, 17}_1 ∧  b^{37, 17}_0 ∧ true) 
c  in CNF:
c     b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ false 
c  in DIMACS:
 15821 -15822 -15823  0
c  -3 does not represent an automaton state.
c    -( b^{37, 17}_2 ∧  b^{37, 17}_1 ∧  b^{37, 17}_0 ∧ true) 
c  in CNF:
c    -b^{37, 17}_2 ∨ -b^{37, 17}_1 ∨ -b^{37, 17}_0 ∨ false 
c  in DIMACS:
-15821 -15822 -15823  0

c i = 18
c  -2+1 --> -1
c    ( b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧  p_666) -> ( b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0)
c  in CNF:
c    -b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨  b^{37, 19}_2
c    -b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_1
c    -b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨  b^{37, 19}_0
c  in DIMACS:
-15824 -15825  15826 -666  15827 0
-15824 -15825  15826 -666 -15828 0
-15824 -15825  15826 -666  15829 0

c  -1+1 --> 0
c    ( b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0 ∧  p_666) -> (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧ -b^{37, 19}_0)
c  in CNF:
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_2
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_1
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_0
c  in DIMACS:
-15824  15825 -15826 -666 -15827 0
-15824  15825 -15826 -666 -15828 0
-15824  15825 -15826 -666 -15829 0

c  0+1 --> 1
c    (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧  p_666) -> (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0)
c  in CNF:
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_2
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_1
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨  b^{37, 19}_0
c  in DIMACS:
 15824  15825  15826 -666 -15827 0
 15824  15825  15826 -666 -15828 0
 15824  15825  15826 -666  15829 0

c  1+1 --> 2
c    (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0 ∧  p_666) -> (-b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0)
c  in CNF:
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_2
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨  b^{37, 19}_1
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ -p_666 ∨ -b^{37, 19}_0
c  in DIMACS:
 15824  15825 -15826 -666 -15827 0
 15824  15825 -15826 -666  15828 0
 15824  15825 -15826 -666 -15829 0

c  2+1 --> break 
c    (-b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧  p_666) -> break
c  in CNF:
c     b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 15824 -15825  15826 -666 1162 0


c  2-1 --> 1
c    (-b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧ -p_666) -> (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0)
c  in CNF:
c     b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_2
c     b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_1
c     b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨  b^{37, 19}_0
c  in DIMACS:
 15824 -15825  15826  666 -15827 0
 15824 -15825  15826  666 -15828 0
 15824 -15825  15826  666  15829 0

c  1-1 --> 0
c    (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0 ∧ -p_666) -> (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧ -b^{37, 19}_0)
c  in CNF:
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_2
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_1
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_0
c  in DIMACS:
 15824  15825 -15826  666 -15827 0
 15824  15825 -15826  666 -15828 0
 15824  15825 -15826  666 -15829 0

c  0-1 --> -1
c    (-b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧ -p_666) -> ( b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0)
c  in CNF:
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨  b^{37, 19}_2
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_1
c     b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨  b^{37, 19}_0
c  in DIMACS:
 15824  15825  15826  666  15827 0
 15824  15825  15826  666 -15828 0
 15824  15825  15826  666  15829 0

c  -1-1 --> -2
c    ( b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧  b^{37, 18}_0 ∧ -p_666) -> ( b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0)
c  in CNF:
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨  b^{37, 19}_2
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨  b^{37, 19}_1
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨  p_666 ∨ -b^{37, 19}_0
c  in DIMACS:
-15824  15825 -15826  666  15827 0
-15824  15825 -15826  666  15828 0
-15824  15825 -15826  666 -15829 0

c  -2-1 --> break 
c    ( b^{37, 18}_2 ∧  b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨  b^{37, 18}_0 ∨  p_666 ∨ break
c  in DIMACS:
-15824 -15825  15826  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 18}_2 ∧ -b^{37, 18}_1 ∧ -b^{37, 18}_0 ∧ true) 
c  in CNF:
c    -b^{37, 18}_2 ∨  b^{37, 18}_1 ∨  b^{37, 18}_0 ∨ false 
c  in DIMACS:
-15824  15825  15826  0

c  3 does not represent an automaton state.
c    -(-b^{37, 18}_2 ∧  b^{37, 18}_1 ∧  b^{37, 18}_0 ∧ true) 
c  in CNF:
c     b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ false 
c  in DIMACS:
 15824 -15825 -15826  0
c  -3 does not represent an automaton state.
c    -( b^{37, 18}_2 ∧  b^{37, 18}_1 ∧  b^{37, 18}_0 ∧ true) 
c  in CNF:
c    -b^{37, 18}_2 ∨ -b^{37, 18}_1 ∨ -b^{37, 18}_0 ∨ false 
c  in DIMACS:
-15824 -15825 -15826  0

c i = 19
c  -2+1 --> -1
c    ( b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧  p_703) -> ( b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0)
c  in CNF:
c    -b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨  b^{37, 20}_2
c    -b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_1
c    -b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨  b^{37, 20}_0
c  in DIMACS:
-15827 -15828  15829 -703  15830 0
-15827 -15828  15829 -703 -15831 0
-15827 -15828  15829 -703  15832 0

c  -1+1 --> 0
c    ( b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0 ∧  p_703) -> (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧ -b^{37, 20}_0)
c  in CNF:
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_2
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_1
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_0
c  in DIMACS:
-15827  15828 -15829 -703 -15830 0
-15827  15828 -15829 -703 -15831 0
-15827  15828 -15829 -703 -15832 0

c  0+1 --> 1
c    (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧  p_703) -> (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0)
c  in CNF:
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_2
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_1
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨  b^{37, 20}_0
c  in DIMACS:
 15827  15828  15829 -703 -15830 0
 15827  15828  15829 -703 -15831 0
 15827  15828  15829 -703  15832 0

c  1+1 --> 2
c    (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0 ∧  p_703) -> (-b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0)
c  in CNF:
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_2
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨  b^{37, 20}_1
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ -p_703 ∨ -b^{37, 20}_0
c  in DIMACS:
 15827  15828 -15829 -703 -15830 0
 15827  15828 -15829 -703  15831 0
 15827  15828 -15829 -703 -15832 0

c  2+1 --> break 
c    (-b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧  p_703) -> break
c  in CNF:
c     b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ -p_703 ∨ break
c  in DIMACS:
 15827 -15828  15829 -703 1162 0


c  2-1 --> 1
c    (-b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧ -p_703) -> (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0)
c  in CNF:
c     b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_2
c     b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_1
c     b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨  b^{37, 20}_0
c  in DIMACS:
 15827 -15828  15829  703 -15830 0
 15827 -15828  15829  703 -15831 0
 15827 -15828  15829  703  15832 0

c  1-1 --> 0
c    (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0 ∧ -p_703) -> (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧ -b^{37, 20}_0)
c  in CNF:
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_2
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_1
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_0
c  in DIMACS:
 15827  15828 -15829  703 -15830 0
 15827  15828 -15829  703 -15831 0
 15827  15828 -15829  703 -15832 0

c  0-1 --> -1
c    (-b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧ -p_703) -> ( b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0)
c  in CNF:
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨  b^{37, 20}_2
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_1
c     b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨  b^{37, 20}_0
c  in DIMACS:
 15827  15828  15829  703  15830 0
 15827  15828  15829  703 -15831 0
 15827  15828  15829  703  15832 0

c  -1-1 --> -2
c    ( b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧  b^{37, 19}_0 ∧ -p_703) -> ( b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0)
c  in CNF:
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨  b^{37, 20}_2
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨  b^{37, 20}_1
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨  p_703 ∨ -b^{37, 20}_0
c  in DIMACS:
-15827  15828 -15829  703  15830 0
-15827  15828 -15829  703  15831 0
-15827  15828 -15829  703 -15832 0

c  -2-1 --> break 
c    ( b^{37, 19}_2 ∧  b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧ -p_703) -> break
c  in CNF:
c    -b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨  b^{37, 19}_0 ∨  p_703 ∨ break
c  in DIMACS:
-15827 -15828  15829  703 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 19}_2 ∧ -b^{37, 19}_1 ∧ -b^{37, 19}_0 ∧ true) 
c  in CNF:
c    -b^{37, 19}_2 ∨  b^{37, 19}_1 ∨  b^{37, 19}_0 ∨ false 
c  in DIMACS:
-15827  15828  15829  0

c  3 does not represent an automaton state.
c    -(-b^{37, 19}_2 ∧  b^{37, 19}_1 ∧  b^{37, 19}_0 ∧ true) 
c  in CNF:
c     b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ false 
c  in DIMACS:
 15827 -15828 -15829  0
c  -3 does not represent an automaton state.
c    -( b^{37, 19}_2 ∧  b^{37, 19}_1 ∧  b^{37, 19}_0 ∧ true) 
c  in CNF:
c    -b^{37, 19}_2 ∨ -b^{37, 19}_1 ∨ -b^{37, 19}_0 ∨ false 
c  in DIMACS:
-15827 -15828 -15829  0

c i = 20
c  -2+1 --> -1
c    ( b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧  p_740) -> ( b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0)
c  in CNF:
c    -b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨  b^{37, 21}_2
c    -b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_1
c    -b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨  b^{37, 21}_0
c  in DIMACS:
-15830 -15831  15832 -740  15833 0
-15830 -15831  15832 -740 -15834 0
-15830 -15831  15832 -740  15835 0

c  -1+1 --> 0
c    ( b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0 ∧  p_740) -> (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧ -b^{37, 21}_0)
c  in CNF:
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_2
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_1
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_0
c  in DIMACS:
-15830  15831 -15832 -740 -15833 0
-15830  15831 -15832 -740 -15834 0
-15830  15831 -15832 -740 -15835 0

c  0+1 --> 1
c    (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧  p_740) -> (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0)
c  in CNF:
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_2
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_1
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨  b^{37, 21}_0
c  in DIMACS:
 15830  15831  15832 -740 -15833 0
 15830  15831  15832 -740 -15834 0
 15830  15831  15832 -740  15835 0

c  1+1 --> 2
c    (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0 ∧  p_740) -> (-b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0)
c  in CNF:
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_2
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨  b^{37, 21}_1
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ -p_740 ∨ -b^{37, 21}_0
c  in DIMACS:
 15830  15831 -15832 -740 -15833 0
 15830  15831 -15832 -740  15834 0
 15830  15831 -15832 -740 -15835 0

c  2+1 --> break 
c    (-b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧  p_740) -> break
c  in CNF:
c     b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 15830 -15831  15832 -740 1162 0


c  2-1 --> 1
c    (-b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧ -p_740) -> (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0)
c  in CNF:
c     b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_2
c     b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_1
c     b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨  b^{37, 21}_0
c  in DIMACS:
 15830 -15831  15832  740 -15833 0
 15830 -15831  15832  740 -15834 0
 15830 -15831  15832  740  15835 0

c  1-1 --> 0
c    (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0 ∧ -p_740) -> (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧ -b^{37, 21}_0)
c  in CNF:
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_2
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_1
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_0
c  in DIMACS:
 15830  15831 -15832  740 -15833 0
 15830  15831 -15832  740 -15834 0
 15830  15831 -15832  740 -15835 0

c  0-1 --> -1
c    (-b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧ -p_740) -> ( b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0)
c  in CNF:
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨  b^{37, 21}_2
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_1
c     b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨  b^{37, 21}_0
c  in DIMACS:
 15830  15831  15832  740  15833 0
 15830  15831  15832  740 -15834 0
 15830  15831  15832  740  15835 0

c  -1-1 --> -2
c    ( b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧  b^{37, 20}_0 ∧ -p_740) -> ( b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0)
c  in CNF:
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨  b^{37, 21}_2
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨  b^{37, 21}_1
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨  p_740 ∨ -b^{37, 21}_0
c  in DIMACS:
-15830  15831 -15832  740  15833 0
-15830  15831 -15832  740  15834 0
-15830  15831 -15832  740 -15835 0

c  -2-1 --> break 
c    ( b^{37, 20}_2 ∧  b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨  b^{37, 20}_0 ∨  p_740 ∨ break
c  in DIMACS:
-15830 -15831  15832  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 20}_2 ∧ -b^{37, 20}_1 ∧ -b^{37, 20}_0 ∧ true) 
c  in CNF:
c    -b^{37, 20}_2 ∨  b^{37, 20}_1 ∨  b^{37, 20}_0 ∨ false 
c  in DIMACS:
-15830  15831  15832  0

c  3 does not represent an automaton state.
c    -(-b^{37, 20}_2 ∧  b^{37, 20}_1 ∧  b^{37, 20}_0 ∧ true) 
c  in CNF:
c     b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ false 
c  in DIMACS:
 15830 -15831 -15832  0
c  -3 does not represent an automaton state.
c    -( b^{37, 20}_2 ∧  b^{37, 20}_1 ∧  b^{37, 20}_0 ∧ true) 
c  in CNF:
c    -b^{37, 20}_2 ∨ -b^{37, 20}_1 ∨ -b^{37, 20}_0 ∨ false 
c  in DIMACS:
-15830 -15831 -15832  0

c i = 21
c  -2+1 --> -1
c    ( b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧  p_777) -> ( b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0)
c  in CNF:
c    -b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨  b^{37, 22}_2
c    -b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_1
c    -b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨  b^{37, 22}_0
c  in DIMACS:
-15833 -15834  15835 -777  15836 0
-15833 -15834  15835 -777 -15837 0
-15833 -15834  15835 -777  15838 0

c  -1+1 --> 0
c    ( b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0 ∧  p_777) -> (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧ -b^{37, 22}_0)
c  in CNF:
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_2
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_1
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_0
c  in DIMACS:
-15833  15834 -15835 -777 -15836 0
-15833  15834 -15835 -777 -15837 0
-15833  15834 -15835 -777 -15838 0

c  0+1 --> 1
c    (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧  p_777) -> (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0)
c  in CNF:
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_2
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_1
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨  b^{37, 22}_0
c  in DIMACS:
 15833  15834  15835 -777 -15836 0
 15833  15834  15835 -777 -15837 0
 15833  15834  15835 -777  15838 0

c  1+1 --> 2
c    (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0 ∧  p_777) -> (-b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0)
c  in CNF:
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_2
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨  b^{37, 22}_1
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ -p_777 ∨ -b^{37, 22}_0
c  in DIMACS:
 15833  15834 -15835 -777 -15836 0
 15833  15834 -15835 -777  15837 0
 15833  15834 -15835 -777 -15838 0

c  2+1 --> break 
c    (-b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧  p_777) -> break
c  in CNF:
c     b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 15833 -15834  15835 -777 1162 0


c  2-1 --> 1
c    (-b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧ -p_777) -> (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0)
c  in CNF:
c     b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_2
c     b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_1
c     b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨  b^{37, 22}_0
c  in DIMACS:
 15833 -15834  15835  777 -15836 0
 15833 -15834  15835  777 -15837 0
 15833 -15834  15835  777  15838 0

c  1-1 --> 0
c    (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0 ∧ -p_777) -> (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧ -b^{37, 22}_0)
c  in CNF:
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_2
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_1
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_0
c  in DIMACS:
 15833  15834 -15835  777 -15836 0
 15833  15834 -15835  777 -15837 0
 15833  15834 -15835  777 -15838 0

c  0-1 --> -1
c    (-b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧ -p_777) -> ( b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0)
c  in CNF:
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨  b^{37, 22}_2
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_1
c     b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨  b^{37, 22}_0
c  in DIMACS:
 15833  15834  15835  777  15836 0
 15833  15834  15835  777 -15837 0
 15833  15834  15835  777  15838 0

c  -1-1 --> -2
c    ( b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧  b^{37, 21}_0 ∧ -p_777) -> ( b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0)
c  in CNF:
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨  b^{37, 22}_2
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨  b^{37, 22}_1
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨  p_777 ∨ -b^{37, 22}_0
c  in DIMACS:
-15833  15834 -15835  777  15836 0
-15833  15834 -15835  777  15837 0
-15833  15834 -15835  777 -15838 0

c  -2-1 --> break 
c    ( b^{37, 21}_2 ∧  b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨  b^{37, 21}_0 ∨  p_777 ∨ break
c  in DIMACS:
-15833 -15834  15835  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 21}_2 ∧ -b^{37, 21}_1 ∧ -b^{37, 21}_0 ∧ true) 
c  in CNF:
c    -b^{37, 21}_2 ∨  b^{37, 21}_1 ∨  b^{37, 21}_0 ∨ false 
c  in DIMACS:
-15833  15834  15835  0

c  3 does not represent an automaton state.
c    -(-b^{37, 21}_2 ∧  b^{37, 21}_1 ∧  b^{37, 21}_0 ∧ true) 
c  in CNF:
c     b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ false 
c  in DIMACS:
 15833 -15834 -15835  0
c  -3 does not represent an automaton state.
c    -( b^{37, 21}_2 ∧  b^{37, 21}_1 ∧  b^{37, 21}_0 ∧ true) 
c  in CNF:
c    -b^{37, 21}_2 ∨ -b^{37, 21}_1 ∨ -b^{37, 21}_0 ∨ false 
c  in DIMACS:
-15833 -15834 -15835  0

c i = 22
c  -2+1 --> -1
c    ( b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧  p_814) -> ( b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0)
c  in CNF:
c    -b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨  b^{37, 23}_2
c    -b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_1
c    -b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨  b^{37, 23}_0
c  in DIMACS:
-15836 -15837  15838 -814  15839 0
-15836 -15837  15838 -814 -15840 0
-15836 -15837  15838 -814  15841 0

c  -1+1 --> 0
c    ( b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0 ∧  p_814) -> (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧ -b^{37, 23}_0)
c  in CNF:
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_2
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_1
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_0
c  in DIMACS:
-15836  15837 -15838 -814 -15839 0
-15836  15837 -15838 -814 -15840 0
-15836  15837 -15838 -814 -15841 0

c  0+1 --> 1
c    (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧  p_814) -> (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0)
c  in CNF:
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_2
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_1
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨  b^{37, 23}_0
c  in DIMACS:
 15836  15837  15838 -814 -15839 0
 15836  15837  15838 -814 -15840 0
 15836  15837  15838 -814  15841 0

c  1+1 --> 2
c    (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0 ∧  p_814) -> (-b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0)
c  in CNF:
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_2
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨  b^{37, 23}_1
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ -p_814 ∨ -b^{37, 23}_0
c  in DIMACS:
 15836  15837 -15838 -814 -15839 0
 15836  15837 -15838 -814  15840 0
 15836  15837 -15838 -814 -15841 0

c  2+1 --> break 
c    (-b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧  p_814) -> break
c  in CNF:
c     b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 15836 -15837  15838 -814 1162 0


c  2-1 --> 1
c    (-b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧ -p_814) -> (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0)
c  in CNF:
c     b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_2
c     b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_1
c     b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨  b^{37, 23}_0
c  in DIMACS:
 15836 -15837  15838  814 -15839 0
 15836 -15837  15838  814 -15840 0
 15836 -15837  15838  814  15841 0

c  1-1 --> 0
c    (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0 ∧ -p_814) -> (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧ -b^{37, 23}_0)
c  in CNF:
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_2
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_1
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_0
c  in DIMACS:
 15836  15837 -15838  814 -15839 0
 15836  15837 -15838  814 -15840 0
 15836  15837 -15838  814 -15841 0

c  0-1 --> -1
c    (-b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧ -p_814) -> ( b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0)
c  in CNF:
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨  b^{37, 23}_2
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_1
c     b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨  b^{37, 23}_0
c  in DIMACS:
 15836  15837  15838  814  15839 0
 15836  15837  15838  814 -15840 0
 15836  15837  15838  814  15841 0

c  -1-1 --> -2
c    ( b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧  b^{37, 22}_0 ∧ -p_814) -> ( b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0)
c  in CNF:
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨  b^{37, 23}_2
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨  b^{37, 23}_1
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨  p_814 ∨ -b^{37, 23}_0
c  in DIMACS:
-15836  15837 -15838  814  15839 0
-15836  15837 -15838  814  15840 0
-15836  15837 -15838  814 -15841 0

c  -2-1 --> break 
c    ( b^{37, 22}_2 ∧  b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨  b^{37, 22}_0 ∨  p_814 ∨ break
c  in DIMACS:
-15836 -15837  15838  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 22}_2 ∧ -b^{37, 22}_1 ∧ -b^{37, 22}_0 ∧ true) 
c  in CNF:
c    -b^{37, 22}_2 ∨  b^{37, 22}_1 ∨  b^{37, 22}_0 ∨ false 
c  in DIMACS:
-15836  15837  15838  0

c  3 does not represent an automaton state.
c    -(-b^{37, 22}_2 ∧  b^{37, 22}_1 ∧  b^{37, 22}_0 ∧ true) 
c  in CNF:
c     b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ false 
c  in DIMACS:
 15836 -15837 -15838  0
c  -3 does not represent an automaton state.
c    -( b^{37, 22}_2 ∧  b^{37, 22}_1 ∧  b^{37, 22}_0 ∧ true) 
c  in CNF:
c    -b^{37, 22}_2 ∨ -b^{37, 22}_1 ∨ -b^{37, 22}_0 ∨ false 
c  in DIMACS:
-15836 -15837 -15838  0

c i = 23
c  -2+1 --> -1
c    ( b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧  p_851) -> ( b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0)
c  in CNF:
c    -b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨  b^{37, 24}_2
c    -b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_1
c    -b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨  b^{37, 24}_0
c  in DIMACS:
-15839 -15840  15841 -851  15842 0
-15839 -15840  15841 -851 -15843 0
-15839 -15840  15841 -851  15844 0

c  -1+1 --> 0
c    ( b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0 ∧  p_851) -> (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧ -b^{37, 24}_0)
c  in CNF:
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_2
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_1
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_0
c  in DIMACS:
-15839  15840 -15841 -851 -15842 0
-15839  15840 -15841 -851 -15843 0
-15839  15840 -15841 -851 -15844 0

c  0+1 --> 1
c    (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧  p_851) -> (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0)
c  in CNF:
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_2
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_1
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨  b^{37, 24}_0
c  in DIMACS:
 15839  15840  15841 -851 -15842 0
 15839  15840  15841 -851 -15843 0
 15839  15840  15841 -851  15844 0

c  1+1 --> 2
c    (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0 ∧  p_851) -> (-b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0)
c  in CNF:
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_2
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨  b^{37, 24}_1
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ -p_851 ∨ -b^{37, 24}_0
c  in DIMACS:
 15839  15840 -15841 -851 -15842 0
 15839  15840 -15841 -851  15843 0
 15839  15840 -15841 -851 -15844 0

c  2+1 --> break 
c    (-b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧  p_851) -> break
c  in CNF:
c     b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ -p_851 ∨ break
c  in DIMACS:
 15839 -15840  15841 -851 1162 0


c  2-1 --> 1
c    (-b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧ -p_851) -> (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0)
c  in CNF:
c     b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_2
c     b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_1
c     b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨  b^{37, 24}_0
c  in DIMACS:
 15839 -15840  15841  851 -15842 0
 15839 -15840  15841  851 -15843 0
 15839 -15840  15841  851  15844 0

c  1-1 --> 0
c    (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0 ∧ -p_851) -> (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧ -b^{37, 24}_0)
c  in CNF:
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_2
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_1
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_0
c  in DIMACS:
 15839  15840 -15841  851 -15842 0
 15839  15840 -15841  851 -15843 0
 15839  15840 -15841  851 -15844 0

c  0-1 --> -1
c    (-b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧ -p_851) -> ( b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0)
c  in CNF:
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨  b^{37, 24}_2
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_1
c     b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨  b^{37, 24}_0
c  in DIMACS:
 15839  15840  15841  851  15842 0
 15839  15840  15841  851 -15843 0
 15839  15840  15841  851  15844 0

c  -1-1 --> -2
c    ( b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧  b^{37, 23}_0 ∧ -p_851) -> ( b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0)
c  in CNF:
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨  b^{37, 24}_2
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨  b^{37, 24}_1
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨  p_851 ∨ -b^{37, 24}_0
c  in DIMACS:
-15839  15840 -15841  851  15842 0
-15839  15840 -15841  851  15843 0
-15839  15840 -15841  851 -15844 0

c  -2-1 --> break 
c    ( b^{37, 23}_2 ∧  b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧ -p_851) -> break
c  in CNF:
c    -b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨  b^{37, 23}_0 ∨  p_851 ∨ break
c  in DIMACS:
-15839 -15840  15841  851 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 23}_2 ∧ -b^{37, 23}_1 ∧ -b^{37, 23}_0 ∧ true) 
c  in CNF:
c    -b^{37, 23}_2 ∨  b^{37, 23}_1 ∨  b^{37, 23}_0 ∨ false 
c  in DIMACS:
-15839  15840  15841  0

c  3 does not represent an automaton state.
c    -(-b^{37, 23}_2 ∧  b^{37, 23}_1 ∧  b^{37, 23}_0 ∧ true) 
c  in CNF:
c     b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ false 
c  in DIMACS:
 15839 -15840 -15841  0
c  -3 does not represent an automaton state.
c    -( b^{37, 23}_2 ∧  b^{37, 23}_1 ∧  b^{37, 23}_0 ∧ true) 
c  in CNF:
c    -b^{37, 23}_2 ∨ -b^{37, 23}_1 ∨ -b^{37, 23}_0 ∨ false 
c  in DIMACS:
-15839 -15840 -15841  0

c i = 24
c  -2+1 --> -1
c    ( b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧  p_888) -> ( b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0)
c  in CNF:
c    -b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨  b^{37, 25}_2
c    -b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_1
c    -b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨  b^{37, 25}_0
c  in DIMACS:
-15842 -15843  15844 -888  15845 0
-15842 -15843  15844 -888 -15846 0
-15842 -15843  15844 -888  15847 0

c  -1+1 --> 0
c    ( b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0 ∧  p_888) -> (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧ -b^{37, 25}_0)
c  in CNF:
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_2
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_1
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_0
c  in DIMACS:
-15842  15843 -15844 -888 -15845 0
-15842  15843 -15844 -888 -15846 0
-15842  15843 -15844 -888 -15847 0

c  0+1 --> 1
c    (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧  p_888) -> (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0)
c  in CNF:
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_2
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_1
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨  b^{37, 25}_0
c  in DIMACS:
 15842  15843  15844 -888 -15845 0
 15842  15843  15844 -888 -15846 0
 15842  15843  15844 -888  15847 0

c  1+1 --> 2
c    (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0 ∧  p_888) -> (-b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0)
c  in CNF:
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_2
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨  b^{37, 25}_1
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ -p_888 ∨ -b^{37, 25}_0
c  in DIMACS:
 15842  15843 -15844 -888 -15845 0
 15842  15843 -15844 -888  15846 0
 15842  15843 -15844 -888 -15847 0

c  2+1 --> break 
c    (-b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧  p_888) -> break
c  in CNF:
c     b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 15842 -15843  15844 -888 1162 0


c  2-1 --> 1
c    (-b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧ -p_888) -> (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0)
c  in CNF:
c     b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_2
c     b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_1
c     b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨  b^{37, 25}_0
c  in DIMACS:
 15842 -15843  15844  888 -15845 0
 15842 -15843  15844  888 -15846 0
 15842 -15843  15844  888  15847 0

c  1-1 --> 0
c    (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0 ∧ -p_888) -> (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧ -b^{37, 25}_0)
c  in CNF:
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_2
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_1
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_0
c  in DIMACS:
 15842  15843 -15844  888 -15845 0
 15842  15843 -15844  888 -15846 0
 15842  15843 -15844  888 -15847 0

c  0-1 --> -1
c    (-b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧ -p_888) -> ( b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0)
c  in CNF:
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨  b^{37, 25}_2
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_1
c     b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨  b^{37, 25}_0
c  in DIMACS:
 15842  15843  15844  888  15845 0
 15842  15843  15844  888 -15846 0
 15842  15843  15844  888  15847 0

c  -1-1 --> -2
c    ( b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧  b^{37, 24}_0 ∧ -p_888) -> ( b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0)
c  in CNF:
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨  b^{37, 25}_2
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨  b^{37, 25}_1
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨  p_888 ∨ -b^{37, 25}_0
c  in DIMACS:
-15842  15843 -15844  888  15845 0
-15842  15843 -15844  888  15846 0
-15842  15843 -15844  888 -15847 0

c  -2-1 --> break 
c    ( b^{37, 24}_2 ∧  b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨  b^{37, 24}_0 ∨  p_888 ∨ break
c  in DIMACS:
-15842 -15843  15844  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 24}_2 ∧ -b^{37, 24}_1 ∧ -b^{37, 24}_0 ∧ true) 
c  in CNF:
c    -b^{37, 24}_2 ∨  b^{37, 24}_1 ∨  b^{37, 24}_0 ∨ false 
c  in DIMACS:
-15842  15843  15844  0

c  3 does not represent an automaton state.
c    -(-b^{37, 24}_2 ∧  b^{37, 24}_1 ∧  b^{37, 24}_0 ∧ true) 
c  in CNF:
c     b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ false 
c  in DIMACS:
 15842 -15843 -15844  0
c  -3 does not represent an automaton state.
c    -( b^{37, 24}_2 ∧  b^{37, 24}_1 ∧  b^{37, 24}_0 ∧ true) 
c  in CNF:
c    -b^{37, 24}_2 ∨ -b^{37, 24}_1 ∨ -b^{37, 24}_0 ∨ false 
c  in DIMACS:
-15842 -15843 -15844  0

c i = 25
c  -2+1 --> -1
c    ( b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧  p_925) -> ( b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0)
c  in CNF:
c    -b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨  b^{37, 26}_2
c    -b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_1
c    -b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨  b^{37, 26}_0
c  in DIMACS:
-15845 -15846  15847 -925  15848 0
-15845 -15846  15847 -925 -15849 0
-15845 -15846  15847 -925  15850 0

c  -1+1 --> 0
c    ( b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0 ∧  p_925) -> (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧ -b^{37, 26}_0)
c  in CNF:
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_2
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_1
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_0
c  in DIMACS:
-15845  15846 -15847 -925 -15848 0
-15845  15846 -15847 -925 -15849 0
-15845  15846 -15847 -925 -15850 0

c  0+1 --> 1
c    (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧  p_925) -> (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0)
c  in CNF:
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_2
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_1
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨  b^{37, 26}_0
c  in DIMACS:
 15845  15846  15847 -925 -15848 0
 15845  15846  15847 -925 -15849 0
 15845  15846  15847 -925  15850 0

c  1+1 --> 2
c    (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0 ∧  p_925) -> (-b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0)
c  in CNF:
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_2
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨  b^{37, 26}_1
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ -p_925 ∨ -b^{37, 26}_0
c  in DIMACS:
 15845  15846 -15847 -925 -15848 0
 15845  15846 -15847 -925  15849 0
 15845  15846 -15847 -925 -15850 0

c  2+1 --> break 
c    (-b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧  p_925) -> break
c  in CNF:
c     b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ -p_925 ∨ break
c  in DIMACS:
 15845 -15846  15847 -925 1162 0


c  2-1 --> 1
c    (-b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧ -p_925) -> (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0)
c  in CNF:
c     b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_2
c     b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_1
c     b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨  b^{37, 26}_0
c  in DIMACS:
 15845 -15846  15847  925 -15848 0
 15845 -15846  15847  925 -15849 0
 15845 -15846  15847  925  15850 0

c  1-1 --> 0
c    (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0 ∧ -p_925) -> (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧ -b^{37, 26}_0)
c  in CNF:
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_2
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_1
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_0
c  in DIMACS:
 15845  15846 -15847  925 -15848 0
 15845  15846 -15847  925 -15849 0
 15845  15846 -15847  925 -15850 0

c  0-1 --> -1
c    (-b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧ -p_925) -> ( b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0)
c  in CNF:
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨  b^{37, 26}_2
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_1
c     b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨  b^{37, 26}_0
c  in DIMACS:
 15845  15846  15847  925  15848 0
 15845  15846  15847  925 -15849 0
 15845  15846  15847  925  15850 0

c  -1-1 --> -2
c    ( b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧  b^{37, 25}_0 ∧ -p_925) -> ( b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0)
c  in CNF:
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨  b^{37, 26}_2
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨  b^{37, 26}_1
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨  p_925 ∨ -b^{37, 26}_0
c  in DIMACS:
-15845  15846 -15847  925  15848 0
-15845  15846 -15847  925  15849 0
-15845  15846 -15847  925 -15850 0

c  -2-1 --> break 
c    ( b^{37, 25}_2 ∧  b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧ -p_925) -> break
c  in CNF:
c    -b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨  b^{37, 25}_0 ∨  p_925 ∨ break
c  in DIMACS:
-15845 -15846  15847  925 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 25}_2 ∧ -b^{37, 25}_1 ∧ -b^{37, 25}_0 ∧ true) 
c  in CNF:
c    -b^{37, 25}_2 ∨  b^{37, 25}_1 ∨  b^{37, 25}_0 ∨ false 
c  in DIMACS:
-15845  15846  15847  0

c  3 does not represent an automaton state.
c    -(-b^{37, 25}_2 ∧  b^{37, 25}_1 ∧  b^{37, 25}_0 ∧ true) 
c  in CNF:
c     b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ false 
c  in DIMACS:
 15845 -15846 -15847  0
c  -3 does not represent an automaton state.
c    -( b^{37, 25}_2 ∧  b^{37, 25}_1 ∧  b^{37, 25}_0 ∧ true) 
c  in CNF:
c    -b^{37, 25}_2 ∨ -b^{37, 25}_1 ∨ -b^{37, 25}_0 ∨ false 
c  in DIMACS:
-15845 -15846 -15847  0

c i = 26
c  -2+1 --> -1
c    ( b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧  p_962) -> ( b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0)
c  in CNF:
c    -b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨  b^{37, 27}_2
c    -b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_1
c    -b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨  b^{37, 27}_0
c  in DIMACS:
-15848 -15849  15850 -962  15851 0
-15848 -15849  15850 -962 -15852 0
-15848 -15849  15850 -962  15853 0

c  -1+1 --> 0
c    ( b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0 ∧  p_962) -> (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧ -b^{37, 27}_0)
c  in CNF:
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_2
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_1
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_0
c  in DIMACS:
-15848  15849 -15850 -962 -15851 0
-15848  15849 -15850 -962 -15852 0
-15848  15849 -15850 -962 -15853 0

c  0+1 --> 1
c    (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧  p_962) -> (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0)
c  in CNF:
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_2
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_1
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨  b^{37, 27}_0
c  in DIMACS:
 15848  15849  15850 -962 -15851 0
 15848  15849  15850 -962 -15852 0
 15848  15849  15850 -962  15853 0

c  1+1 --> 2
c    (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0 ∧  p_962) -> (-b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0)
c  in CNF:
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_2
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨  b^{37, 27}_1
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ -p_962 ∨ -b^{37, 27}_0
c  in DIMACS:
 15848  15849 -15850 -962 -15851 0
 15848  15849 -15850 -962  15852 0
 15848  15849 -15850 -962 -15853 0

c  2+1 --> break 
c    (-b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧  p_962) -> break
c  in CNF:
c     b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 15848 -15849  15850 -962 1162 0


c  2-1 --> 1
c    (-b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧ -p_962) -> (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0)
c  in CNF:
c     b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_2
c     b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_1
c     b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨  b^{37, 27}_0
c  in DIMACS:
 15848 -15849  15850  962 -15851 0
 15848 -15849  15850  962 -15852 0
 15848 -15849  15850  962  15853 0

c  1-1 --> 0
c    (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0 ∧ -p_962) -> (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧ -b^{37, 27}_0)
c  in CNF:
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_2
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_1
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_0
c  in DIMACS:
 15848  15849 -15850  962 -15851 0
 15848  15849 -15850  962 -15852 0
 15848  15849 -15850  962 -15853 0

c  0-1 --> -1
c    (-b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧ -p_962) -> ( b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0)
c  in CNF:
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨  b^{37, 27}_2
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_1
c     b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨  b^{37, 27}_0
c  in DIMACS:
 15848  15849  15850  962  15851 0
 15848  15849  15850  962 -15852 0
 15848  15849  15850  962  15853 0

c  -1-1 --> -2
c    ( b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧  b^{37, 26}_0 ∧ -p_962) -> ( b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0)
c  in CNF:
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨  b^{37, 27}_2
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨  b^{37, 27}_1
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨  p_962 ∨ -b^{37, 27}_0
c  in DIMACS:
-15848  15849 -15850  962  15851 0
-15848  15849 -15850  962  15852 0
-15848  15849 -15850  962 -15853 0

c  -2-1 --> break 
c    ( b^{37, 26}_2 ∧  b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨  b^{37, 26}_0 ∨  p_962 ∨ break
c  in DIMACS:
-15848 -15849  15850  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 26}_2 ∧ -b^{37, 26}_1 ∧ -b^{37, 26}_0 ∧ true) 
c  in CNF:
c    -b^{37, 26}_2 ∨  b^{37, 26}_1 ∨  b^{37, 26}_0 ∨ false 
c  in DIMACS:
-15848  15849  15850  0

c  3 does not represent an automaton state.
c    -(-b^{37, 26}_2 ∧  b^{37, 26}_1 ∧  b^{37, 26}_0 ∧ true) 
c  in CNF:
c     b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ false 
c  in DIMACS:
 15848 -15849 -15850  0
c  -3 does not represent an automaton state.
c    -( b^{37, 26}_2 ∧  b^{37, 26}_1 ∧  b^{37, 26}_0 ∧ true) 
c  in CNF:
c    -b^{37, 26}_2 ∨ -b^{37, 26}_1 ∨ -b^{37, 26}_0 ∨ false 
c  in DIMACS:
-15848 -15849 -15850  0

c i = 27
c  -2+1 --> -1
c    ( b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧  p_999) -> ( b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0)
c  in CNF:
c    -b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨  b^{37, 28}_2
c    -b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_1
c    -b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨  b^{37, 28}_0
c  in DIMACS:
-15851 -15852  15853 -999  15854 0
-15851 -15852  15853 -999 -15855 0
-15851 -15852  15853 -999  15856 0

c  -1+1 --> 0
c    ( b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0 ∧  p_999) -> (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧ -b^{37, 28}_0)
c  in CNF:
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_2
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_1
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_0
c  in DIMACS:
-15851  15852 -15853 -999 -15854 0
-15851  15852 -15853 -999 -15855 0
-15851  15852 -15853 -999 -15856 0

c  0+1 --> 1
c    (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧  p_999) -> (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0)
c  in CNF:
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_2
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_1
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨  b^{37, 28}_0
c  in DIMACS:
 15851  15852  15853 -999 -15854 0
 15851  15852  15853 -999 -15855 0
 15851  15852  15853 -999  15856 0

c  1+1 --> 2
c    (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0 ∧  p_999) -> (-b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0)
c  in CNF:
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_2
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨  b^{37, 28}_1
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ -p_999 ∨ -b^{37, 28}_0
c  in DIMACS:
 15851  15852 -15853 -999 -15854 0
 15851  15852 -15853 -999  15855 0
 15851  15852 -15853 -999 -15856 0

c  2+1 --> break 
c    (-b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧  p_999) -> break
c  in CNF:
c     b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 15851 -15852  15853 -999 1162 0


c  2-1 --> 1
c    (-b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧ -p_999) -> (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0)
c  in CNF:
c     b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_2
c     b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_1
c     b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨  b^{37, 28}_0
c  in DIMACS:
 15851 -15852  15853  999 -15854 0
 15851 -15852  15853  999 -15855 0
 15851 -15852  15853  999  15856 0

c  1-1 --> 0
c    (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0 ∧ -p_999) -> (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧ -b^{37, 28}_0)
c  in CNF:
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_2
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_1
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_0
c  in DIMACS:
 15851  15852 -15853  999 -15854 0
 15851  15852 -15853  999 -15855 0
 15851  15852 -15853  999 -15856 0

c  0-1 --> -1
c    (-b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧ -p_999) -> ( b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0)
c  in CNF:
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨  b^{37, 28}_2
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_1
c     b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨  b^{37, 28}_0
c  in DIMACS:
 15851  15852  15853  999  15854 0
 15851  15852  15853  999 -15855 0
 15851  15852  15853  999  15856 0

c  -1-1 --> -2
c    ( b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧  b^{37, 27}_0 ∧ -p_999) -> ( b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0)
c  in CNF:
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨  b^{37, 28}_2
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨  b^{37, 28}_1
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨  p_999 ∨ -b^{37, 28}_0
c  in DIMACS:
-15851  15852 -15853  999  15854 0
-15851  15852 -15853  999  15855 0
-15851  15852 -15853  999 -15856 0

c  -2-1 --> break 
c    ( b^{37, 27}_2 ∧  b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨  b^{37, 27}_0 ∨  p_999 ∨ break
c  in DIMACS:
-15851 -15852  15853  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 27}_2 ∧ -b^{37, 27}_1 ∧ -b^{37, 27}_0 ∧ true) 
c  in CNF:
c    -b^{37, 27}_2 ∨  b^{37, 27}_1 ∨  b^{37, 27}_0 ∨ false 
c  in DIMACS:
-15851  15852  15853  0

c  3 does not represent an automaton state.
c    -(-b^{37, 27}_2 ∧  b^{37, 27}_1 ∧  b^{37, 27}_0 ∧ true) 
c  in CNF:
c     b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ false 
c  in DIMACS:
 15851 -15852 -15853  0
c  -3 does not represent an automaton state.
c    -( b^{37, 27}_2 ∧  b^{37, 27}_1 ∧  b^{37, 27}_0 ∧ true) 
c  in CNF:
c    -b^{37, 27}_2 ∨ -b^{37, 27}_1 ∨ -b^{37, 27}_0 ∨ false 
c  in DIMACS:
-15851 -15852 -15853  0

c i = 28
c  -2+1 --> -1
c    ( b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧  p_1036) -> ( b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0)
c  in CNF:
c    -b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨  b^{37, 29}_2
c    -b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_1
c    -b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨  b^{37, 29}_0
c  in DIMACS:
-15854 -15855  15856 -1036  15857 0
-15854 -15855  15856 -1036 -15858 0
-15854 -15855  15856 -1036  15859 0

c  -1+1 --> 0
c    ( b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0 ∧  p_1036) -> (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧ -b^{37, 29}_0)
c  in CNF:
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_2
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_1
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_0
c  in DIMACS:
-15854  15855 -15856 -1036 -15857 0
-15854  15855 -15856 -1036 -15858 0
-15854  15855 -15856 -1036 -15859 0

c  0+1 --> 1
c    (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧  p_1036) -> (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0)
c  in CNF:
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_2
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_1
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨  b^{37, 29}_0
c  in DIMACS:
 15854  15855  15856 -1036 -15857 0
 15854  15855  15856 -1036 -15858 0
 15854  15855  15856 -1036  15859 0

c  1+1 --> 2
c    (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0 ∧  p_1036) -> (-b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0)
c  in CNF:
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_2
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨  b^{37, 29}_1
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ -p_1036 ∨ -b^{37, 29}_0
c  in DIMACS:
 15854  15855 -15856 -1036 -15857 0
 15854  15855 -15856 -1036  15858 0
 15854  15855 -15856 -1036 -15859 0

c  2+1 --> break 
c    (-b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 15854 -15855  15856 -1036 1162 0


c  2-1 --> 1
c    (-b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧ -p_1036) -> (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0)
c  in CNF:
c     b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_2
c     b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_1
c     b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨  b^{37, 29}_0
c  in DIMACS:
 15854 -15855  15856  1036 -15857 0
 15854 -15855  15856  1036 -15858 0
 15854 -15855  15856  1036  15859 0

c  1-1 --> 0
c    (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0 ∧ -p_1036) -> (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧ -b^{37, 29}_0)
c  in CNF:
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_2
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_1
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_0
c  in DIMACS:
 15854  15855 -15856  1036 -15857 0
 15854  15855 -15856  1036 -15858 0
 15854  15855 -15856  1036 -15859 0

c  0-1 --> -1
c    (-b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧ -p_1036) -> ( b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0)
c  in CNF:
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨  b^{37, 29}_2
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_1
c     b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨  b^{37, 29}_0
c  in DIMACS:
 15854  15855  15856  1036  15857 0
 15854  15855  15856  1036 -15858 0
 15854  15855  15856  1036  15859 0

c  -1-1 --> -2
c    ( b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧  b^{37, 28}_0 ∧ -p_1036) -> ( b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0)
c  in CNF:
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨  b^{37, 29}_2
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨  b^{37, 29}_1
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨  p_1036 ∨ -b^{37, 29}_0
c  in DIMACS:
-15854  15855 -15856  1036  15857 0
-15854  15855 -15856  1036  15858 0
-15854  15855 -15856  1036 -15859 0

c  -2-1 --> break 
c    ( b^{37, 28}_2 ∧  b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨  b^{37, 28}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-15854 -15855  15856  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 28}_2 ∧ -b^{37, 28}_1 ∧ -b^{37, 28}_0 ∧ true) 
c  in CNF:
c    -b^{37, 28}_2 ∨  b^{37, 28}_1 ∨  b^{37, 28}_0 ∨ false 
c  in DIMACS:
-15854  15855  15856  0

c  3 does not represent an automaton state.
c    -(-b^{37, 28}_2 ∧  b^{37, 28}_1 ∧  b^{37, 28}_0 ∧ true) 
c  in CNF:
c     b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ false 
c  in DIMACS:
 15854 -15855 -15856  0
c  -3 does not represent an automaton state.
c    -( b^{37, 28}_2 ∧  b^{37, 28}_1 ∧  b^{37, 28}_0 ∧ true) 
c  in CNF:
c    -b^{37, 28}_2 ∨ -b^{37, 28}_1 ∨ -b^{37, 28}_0 ∨ false 
c  in DIMACS:
-15854 -15855 -15856  0

c i = 29
c  -2+1 --> -1
c    ( b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧  p_1073) -> ( b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0)
c  in CNF:
c    -b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨  b^{37, 30}_2
c    -b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_1
c    -b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨  b^{37, 30}_0
c  in DIMACS:
-15857 -15858  15859 -1073  15860 0
-15857 -15858  15859 -1073 -15861 0
-15857 -15858  15859 -1073  15862 0

c  -1+1 --> 0
c    ( b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0 ∧  p_1073) -> (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧ -b^{37, 30}_0)
c  in CNF:
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_2
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_1
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_0
c  in DIMACS:
-15857  15858 -15859 -1073 -15860 0
-15857  15858 -15859 -1073 -15861 0
-15857  15858 -15859 -1073 -15862 0

c  0+1 --> 1
c    (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧  p_1073) -> (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0)
c  in CNF:
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_2
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_1
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨  b^{37, 30}_0
c  in DIMACS:
 15857  15858  15859 -1073 -15860 0
 15857  15858  15859 -1073 -15861 0
 15857  15858  15859 -1073  15862 0

c  1+1 --> 2
c    (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0 ∧  p_1073) -> (-b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0)
c  in CNF:
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_2
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨  b^{37, 30}_1
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ -p_1073 ∨ -b^{37, 30}_0
c  in DIMACS:
 15857  15858 -15859 -1073 -15860 0
 15857  15858 -15859 -1073  15861 0
 15857  15858 -15859 -1073 -15862 0

c  2+1 --> break 
c    (-b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧  p_1073) -> break
c  in CNF:
c     b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ -p_1073 ∨ break
c  in DIMACS:
 15857 -15858  15859 -1073 1162 0


c  2-1 --> 1
c    (-b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧ -p_1073) -> (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0)
c  in CNF:
c     b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_2
c     b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_1
c     b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨  b^{37, 30}_0
c  in DIMACS:
 15857 -15858  15859  1073 -15860 0
 15857 -15858  15859  1073 -15861 0
 15857 -15858  15859  1073  15862 0

c  1-1 --> 0
c    (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0 ∧ -p_1073) -> (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧ -b^{37, 30}_0)
c  in CNF:
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_2
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_1
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_0
c  in DIMACS:
 15857  15858 -15859  1073 -15860 0
 15857  15858 -15859  1073 -15861 0
 15857  15858 -15859  1073 -15862 0

c  0-1 --> -1
c    (-b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧ -p_1073) -> ( b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0)
c  in CNF:
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨  b^{37, 30}_2
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_1
c     b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨  b^{37, 30}_0
c  in DIMACS:
 15857  15858  15859  1073  15860 0
 15857  15858  15859  1073 -15861 0
 15857  15858  15859  1073  15862 0

c  -1-1 --> -2
c    ( b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧  b^{37, 29}_0 ∧ -p_1073) -> ( b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0)
c  in CNF:
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨  b^{37, 30}_2
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨  b^{37, 30}_1
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨  p_1073 ∨ -b^{37, 30}_0
c  in DIMACS:
-15857  15858 -15859  1073  15860 0
-15857  15858 -15859  1073  15861 0
-15857  15858 -15859  1073 -15862 0

c  -2-1 --> break 
c    ( b^{37, 29}_2 ∧  b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧ -p_1073) -> break
c  in CNF:
c    -b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨  b^{37, 29}_0 ∨  p_1073 ∨ break
c  in DIMACS:
-15857 -15858  15859  1073 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 29}_2 ∧ -b^{37, 29}_1 ∧ -b^{37, 29}_0 ∧ true) 
c  in CNF:
c    -b^{37, 29}_2 ∨  b^{37, 29}_1 ∨  b^{37, 29}_0 ∨ false 
c  in DIMACS:
-15857  15858  15859  0

c  3 does not represent an automaton state.
c    -(-b^{37, 29}_2 ∧  b^{37, 29}_1 ∧  b^{37, 29}_0 ∧ true) 
c  in CNF:
c     b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ false 
c  in DIMACS:
 15857 -15858 -15859  0
c  -3 does not represent an automaton state.
c    -( b^{37, 29}_2 ∧  b^{37, 29}_1 ∧  b^{37, 29}_0 ∧ true) 
c  in CNF:
c    -b^{37, 29}_2 ∨ -b^{37, 29}_1 ∨ -b^{37, 29}_0 ∨ false 
c  in DIMACS:
-15857 -15858 -15859  0

c i = 30
c  -2+1 --> -1
c    ( b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧  p_1110) -> ( b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0)
c  in CNF:
c    -b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨  b^{37, 31}_2
c    -b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_1
c    -b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨  b^{37, 31}_0
c  in DIMACS:
-15860 -15861  15862 -1110  15863 0
-15860 -15861  15862 -1110 -15864 0
-15860 -15861  15862 -1110  15865 0

c  -1+1 --> 0
c    ( b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0 ∧  p_1110) -> (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧ -b^{37, 31}_0)
c  in CNF:
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_2
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_1
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_0
c  in DIMACS:
-15860  15861 -15862 -1110 -15863 0
-15860  15861 -15862 -1110 -15864 0
-15860  15861 -15862 -1110 -15865 0

c  0+1 --> 1
c    (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧  p_1110) -> (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0)
c  in CNF:
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_2
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_1
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨  b^{37, 31}_0
c  in DIMACS:
 15860  15861  15862 -1110 -15863 0
 15860  15861  15862 -1110 -15864 0
 15860  15861  15862 -1110  15865 0

c  1+1 --> 2
c    (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0 ∧  p_1110) -> (-b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0)
c  in CNF:
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_2
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨  b^{37, 31}_1
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ -p_1110 ∨ -b^{37, 31}_0
c  in DIMACS:
 15860  15861 -15862 -1110 -15863 0
 15860  15861 -15862 -1110  15864 0
 15860  15861 -15862 -1110 -15865 0

c  2+1 --> break 
c    (-b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 15860 -15861  15862 -1110 1162 0


c  2-1 --> 1
c    (-b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧ -p_1110) -> (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0)
c  in CNF:
c     b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_2
c     b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_1
c     b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨  b^{37, 31}_0
c  in DIMACS:
 15860 -15861  15862  1110 -15863 0
 15860 -15861  15862  1110 -15864 0
 15860 -15861  15862  1110  15865 0

c  1-1 --> 0
c    (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0 ∧ -p_1110) -> (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧ -b^{37, 31}_0)
c  in CNF:
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_2
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_1
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_0
c  in DIMACS:
 15860  15861 -15862  1110 -15863 0
 15860  15861 -15862  1110 -15864 0
 15860  15861 -15862  1110 -15865 0

c  0-1 --> -1
c    (-b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧ -p_1110) -> ( b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0)
c  in CNF:
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨  b^{37, 31}_2
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_1
c     b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨  b^{37, 31}_0
c  in DIMACS:
 15860  15861  15862  1110  15863 0
 15860  15861  15862  1110 -15864 0
 15860  15861  15862  1110  15865 0

c  -1-1 --> -2
c    ( b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧  b^{37, 30}_0 ∧ -p_1110) -> ( b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0)
c  in CNF:
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨  b^{37, 31}_2
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨  b^{37, 31}_1
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨  p_1110 ∨ -b^{37, 31}_0
c  in DIMACS:
-15860  15861 -15862  1110  15863 0
-15860  15861 -15862  1110  15864 0
-15860  15861 -15862  1110 -15865 0

c  -2-1 --> break 
c    ( b^{37, 30}_2 ∧  b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨  b^{37, 30}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-15860 -15861  15862  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 30}_2 ∧ -b^{37, 30}_1 ∧ -b^{37, 30}_0 ∧ true) 
c  in CNF:
c    -b^{37, 30}_2 ∨  b^{37, 30}_1 ∨  b^{37, 30}_0 ∨ false 
c  in DIMACS:
-15860  15861  15862  0

c  3 does not represent an automaton state.
c    -(-b^{37, 30}_2 ∧  b^{37, 30}_1 ∧  b^{37, 30}_0 ∧ true) 
c  in CNF:
c     b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ false 
c  in DIMACS:
 15860 -15861 -15862  0
c  -3 does not represent an automaton state.
c    -( b^{37, 30}_2 ∧  b^{37, 30}_1 ∧  b^{37, 30}_0 ∧ true) 
c  in CNF:
c    -b^{37, 30}_2 ∨ -b^{37, 30}_1 ∨ -b^{37, 30}_0 ∨ false 
c  in DIMACS:
-15860 -15861 -15862  0

c i = 31
c  -2+1 --> -1
c    ( b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧  p_1147) -> ( b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧  b^{37, 32}_0)
c  in CNF:
c    -b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨  b^{37, 32}_2
c    -b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_1
c    -b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨  b^{37, 32}_0
c  in DIMACS:
-15863 -15864  15865 -1147  15866 0
-15863 -15864  15865 -1147 -15867 0
-15863 -15864  15865 -1147  15868 0

c  -1+1 --> 0
c    ( b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0 ∧  p_1147) -> (-b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧ -b^{37, 32}_0)
c  in CNF:
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_2
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_1
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_0
c  in DIMACS:
-15863  15864 -15865 -1147 -15866 0
-15863  15864 -15865 -1147 -15867 0
-15863  15864 -15865 -1147 -15868 0

c  0+1 --> 1
c    (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧  p_1147) -> (-b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧  b^{37, 32}_0)
c  in CNF:
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_2
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_1
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨  b^{37, 32}_0
c  in DIMACS:
 15863  15864  15865 -1147 -15866 0
 15863  15864  15865 -1147 -15867 0
 15863  15864  15865 -1147  15868 0

c  1+1 --> 2
c    (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0 ∧  p_1147) -> (-b^{37, 32}_2 ∧  b^{37, 32}_1 ∧ -b^{37, 32}_0)
c  in CNF:
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_2
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨  b^{37, 32}_1
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ -p_1147 ∨ -b^{37, 32}_0
c  in DIMACS:
 15863  15864 -15865 -1147 -15866 0
 15863  15864 -15865 -1147  15867 0
 15863  15864 -15865 -1147 -15868 0

c  2+1 --> break 
c    (-b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧  p_1147) -> break
c  in CNF:
c     b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ -p_1147 ∨ break
c  in DIMACS:
 15863 -15864  15865 -1147 1162 0


c  2-1 --> 1
c    (-b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧ -p_1147) -> (-b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧  b^{37, 32}_0)
c  in CNF:
c     b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_2
c     b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_1
c     b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨  b^{37, 32}_0
c  in DIMACS:
 15863 -15864  15865  1147 -15866 0
 15863 -15864  15865  1147 -15867 0
 15863 -15864  15865  1147  15868 0

c  1-1 --> 0
c    (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0 ∧ -p_1147) -> (-b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧ -b^{37, 32}_0)
c  in CNF:
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_2
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_1
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_0
c  in DIMACS:
 15863  15864 -15865  1147 -15866 0
 15863  15864 -15865  1147 -15867 0
 15863  15864 -15865  1147 -15868 0

c  0-1 --> -1
c    (-b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧ -p_1147) -> ( b^{37, 32}_2 ∧ -b^{37, 32}_1 ∧  b^{37, 32}_0)
c  in CNF:
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨  b^{37, 32}_2
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_1
c     b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨  b^{37, 32}_0
c  in DIMACS:
 15863  15864  15865  1147  15866 0
 15863  15864  15865  1147 -15867 0
 15863  15864  15865  1147  15868 0

c  -1-1 --> -2
c    ( b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧  b^{37, 31}_0 ∧ -p_1147) -> ( b^{37, 32}_2 ∧  b^{37, 32}_1 ∧ -b^{37, 32}_0)
c  in CNF:
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨  b^{37, 32}_2
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨  b^{37, 32}_1
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨  p_1147 ∨ -b^{37, 32}_0
c  in DIMACS:
-15863  15864 -15865  1147  15866 0
-15863  15864 -15865  1147  15867 0
-15863  15864 -15865  1147 -15868 0

c  -2-1 --> break 
c    ( b^{37, 31}_2 ∧  b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧ -p_1147) -> break
c  in CNF:
c    -b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨  b^{37, 31}_0 ∨  p_1147 ∨ break
c  in DIMACS:
-15863 -15864  15865  1147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{37, 31}_2 ∧ -b^{37, 31}_1 ∧ -b^{37, 31}_0 ∧ true) 
c  in CNF:
c    -b^{37, 31}_2 ∨  b^{37, 31}_1 ∨  b^{37, 31}_0 ∨ false 
c  in DIMACS:
-15863  15864  15865  0

c  3 does not represent an automaton state.
c    -(-b^{37, 31}_2 ∧  b^{37, 31}_1 ∧  b^{37, 31}_0 ∧ true) 
c  in CNF:
c     b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ false 
c  in DIMACS:
 15863 -15864 -15865  0
c  -3 does not represent an automaton state.
c    -( b^{37, 31}_2 ∧  b^{37, 31}_1 ∧  b^{37, 31}_0 ∧ true) 
c  in CNF:
c    -b^{37, 31}_2 ∨ -b^{37, 31}_1 ∨ -b^{37, 31}_0 ∨ false 
c  in DIMACS:
-15863 -15864 -15865  0

c INIT for k = 38
c    -b^{38, 1}_2
c    -b^{38, 1}_1
c    -b^{38, 1}_0
c  in DIMACS:
-15869 0
-15870 0
-15871 0

c Transitions for k = 38
c i = 1
c  -2+1 --> -1
c    ( b^{38, 1}_2 ∧  b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧  p_38) -> ( b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0)
c  in CNF:
c    -b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨  b^{38, 2}_2
c    -b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_1
c    -b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨  b^{38, 2}_0
c  in DIMACS:
-15869 -15870  15871 -38  15872 0
-15869 -15870  15871 -38 -15873 0
-15869 -15870  15871 -38  15874 0

c  -1+1 --> 0
c    ( b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧  b^{38, 1}_0 ∧  p_38) -> (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧ -b^{38, 2}_0)
c  in CNF:
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_2
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_1
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_0
c  in DIMACS:
-15869  15870 -15871 -38 -15872 0
-15869  15870 -15871 -38 -15873 0
-15869  15870 -15871 -38 -15874 0

c  0+1 --> 1
c    (-b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧  p_38) -> (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0)
c  in CNF:
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_2
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_1
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨  b^{38, 2}_0
c  in DIMACS:
 15869  15870  15871 -38 -15872 0
 15869  15870  15871 -38 -15873 0
 15869  15870  15871 -38  15874 0

c  1+1 --> 2
c    (-b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧  b^{38, 1}_0 ∧  p_38) -> (-b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0)
c  in CNF:
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_2
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨  b^{38, 2}_1
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ -p_38 ∨ -b^{38, 2}_0
c  in DIMACS:
 15869  15870 -15871 -38 -15872 0
 15869  15870 -15871 -38  15873 0
 15869  15870 -15871 -38 -15874 0

c  2+1 --> break 
c    (-b^{38, 1}_2 ∧  b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧  p_38) -> break
c  in CNF:
c     b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ -p_38 ∨ break
c  in DIMACS:
 15869 -15870  15871 -38 1162 0


c  2-1 --> 1
c    (-b^{38, 1}_2 ∧  b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧ -p_38) -> (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0)
c  in CNF:
c     b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_2
c     b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_1
c     b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨  b^{38, 2}_0
c  in DIMACS:
 15869 -15870  15871  38 -15872 0
 15869 -15870  15871  38 -15873 0
 15869 -15870  15871  38  15874 0

c  1-1 --> 0
c    (-b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧  b^{38, 1}_0 ∧ -p_38) -> (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧ -b^{38, 2}_0)
c  in CNF:
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_2
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_1
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_0
c  in DIMACS:
 15869  15870 -15871  38 -15872 0
 15869  15870 -15871  38 -15873 0
 15869  15870 -15871  38 -15874 0

c  0-1 --> -1
c    (-b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧ -p_38) -> ( b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0)
c  in CNF:
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨  b^{38, 2}_2
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_1
c     b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨  b^{38, 2}_0
c  in DIMACS:
 15869  15870  15871  38  15872 0
 15869  15870  15871  38 -15873 0
 15869  15870  15871  38  15874 0

c  -1-1 --> -2
c    ( b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧  b^{38, 1}_0 ∧ -p_38) -> ( b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0)
c  in CNF:
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨  b^{38, 2}_2
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨  b^{38, 2}_1
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨  p_38 ∨ -b^{38, 2}_0
c  in DIMACS:
-15869  15870 -15871  38  15872 0
-15869  15870 -15871  38  15873 0
-15869  15870 -15871  38 -15874 0

c  -2-1 --> break 
c    ( b^{38, 1}_2 ∧  b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧ -p_38) -> break
c  in CNF:
c    -b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨  b^{38, 1}_0 ∨  p_38 ∨ break
c  in DIMACS:
-15869 -15870  15871  38 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 1}_2 ∧ -b^{38, 1}_1 ∧ -b^{38, 1}_0 ∧ true) 
c  in CNF:
c    -b^{38, 1}_2 ∨  b^{38, 1}_1 ∨  b^{38, 1}_0 ∨ false 
c  in DIMACS:
-15869  15870  15871  0

c  3 does not represent an automaton state.
c    -(-b^{38, 1}_2 ∧  b^{38, 1}_1 ∧  b^{38, 1}_0 ∧ true) 
c  in CNF:
c     b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ false 
c  in DIMACS:
 15869 -15870 -15871  0
c  -3 does not represent an automaton state.
c    -( b^{38, 1}_2 ∧  b^{38, 1}_1 ∧  b^{38, 1}_0 ∧ true) 
c  in CNF:
c    -b^{38, 1}_2 ∨ -b^{38, 1}_1 ∨ -b^{38, 1}_0 ∨ false 
c  in DIMACS:
-15869 -15870 -15871  0

c i = 2
c  -2+1 --> -1
c    ( b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧  p_76) -> ( b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0)
c  in CNF:
c    -b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨  b^{38, 3}_2
c    -b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_1
c    -b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨  b^{38, 3}_0
c  in DIMACS:
-15872 -15873  15874 -76  15875 0
-15872 -15873  15874 -76 -15876 0
-15872 -15873  15874 -76  15877 0

c  -1+1 --> 0
c    ( b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0 ∧  p_76) -> (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧ -b^{38, 3}_0)
c  in CNF:
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_2
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_1
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_0
c  in DIMACS:
-15872  15873 -15874 -76 -15875 0
-15872  15873 -15874 -76 -15876 0
-15872  15873 -15874 -76 -15877 0

c  0+1 --> 1
c    (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧  p_76) -> (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0)
c  in CNF:
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_2
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_1
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨  b^{38, 3}_0
c  in DIMACS:
 15872  15873  15874 -76 -15875 0
 15872  15873  15874 -76 -15876 0
 15872  15873  15874 -76  15877 0

c  1+1 --> 2
c    (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0 ∧  p_76) -> (-b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0)
c  in CNF:
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_2
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨  b^{38, 3}_1
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ -p_76 ∨ -b^{38, 3}_0
c  in DIMACS:
 15872  15873 -15874 -76 -15875 0
 15872  15873 -15874 -76  15876 0
 15872  15873 -15874 -76 -15877 0

c  2+1 --> break 
c    (-b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧  p_76) -> break
c  in CNF:
c     b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 15872 -15873  15874 -76 1162 0


c  2-1 --> 1
c    (-b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧ -p_76) -> (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0)
c  in CNF:
c     b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_2
c     b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_1
c     b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨  b^{38, 3}_0
c  in DIMACS:
 15872 -15873  15874  76 -15875 0
 15872 -15873  15874  76 -15876 0
 15872 -15873  15874  76  15877 0

c  1-1 --> 0
c    (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0 ∧ -p_76) -> (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧ -b^{38, 3}_0)
c  in CNF:
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_2
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_1
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_0
c  in DIMACS:
 15872  15873 -15874  76 -15875 0
 15872  15873 -15874  76 -15876 0
 15872  15873 -15874  76 -15877 0

c  0-1 --> -1
c    (-b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧ -p_76) -> ( b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0)
c  in CNF:
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨  b^{38, 3}_2
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_1
c     b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨  b^{38, 3}_0
c  in DIMACS:
 15872  15873  15874  76  15875 0
 15872  15873  15874  76 -15876 0
 15872  15873  15874  76  15877 0

c  -1-1 --> -2
c    ( b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧  b^{38, 2}_0 ∧ -p_76) -> ( b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0)
c  in CNF:
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨  b^{38, 3}_2
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨  b^{38, 3}_1
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨  p_76 ∨ -b^{38, 3}_0
c  in DIMACS:
-15872  15873 -15874  76  15875 0
-15872  15873 -15874  76  15876 0
-15872  15873 -15874  76 -15877 0

c  -2-1 --> break 
c    ( b^{38, 2}_2 ∧  b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨  b^{38, 2}_0 ∨  p_76 ∨ break
c  in DIMACS:
-15872 -15873  15874  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 2}_2 ∧ -b^{38, 2}_1 ∧ -b^{38, 2}_0 ∧ true) 
c  in CNF:
c    -b^{38, 2}_2 ∨  b^{38, 2}_1 ∨  b^{38, 2}_0 ∨ false 
c  in DIMACS:
-15872  15873  15874  0

c  3 does not represent an automaton state.
c    -(-b^{38, 2}_2 ∧  b^{38, 2}_1 ∧  b^{38, 2}_0 ∧ true) 
c  in CNF:
c     b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ false 
c  in DIMACS:
 15872 -15873 -15874  0
c  -3 does not represent an automaton state.
c    -( b^{38, 2}_2 ∧  b^{38, 2}_1 ∧  b^{38, 2}_0 ∧ true) 
c  in CNF:
c    -b^{38, 2}_2 ∨ -b^{38, 2}_1 ∨ -b^{38, 2}_0 ∨ false 
c  in DIMACS:
-15872 -15873 -15874  0

c i = 3
c  -2+1 --> -1
c    ( b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧  p_114) -> ( b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0)
c  in CNF:
c    -b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨  b^{38, 4}_2
c    -b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_1
c    -b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨  b^{38, 4}_0
c  in DIMACS:
-15875 -15876  15877 -114  15878 0
-15875 -15876  15877 -114 -15879 0
-15875 -15876  15877 -114  15880 0

c  -1+1 --> 0
c    ( b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0 ∧  p_114) -> (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧ -b^{38, 4}_0)
c  in CNF:
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_2
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_1
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_0
c  in DIMACS:
-15875  15876 -15877 -114 -15878 0
-15875  15876 -15877 -114 -15879 0
-15875  15876 -15877 -114 -15880 0

c  0+1 --> 1
c    (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧  p_114) -> (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0)
c  in CNF:
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_2
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_1
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨  b^{38, 4}_0
c  in DIMACS:
 15875  15876  15877 -114 -15878 0
 15875  15876  15877 -114 -15879 0
 15875  15876  15877 -114  15880 0

c  1+1 --> 2
c    (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0 ∧  p_114) -> (-b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0)
c  in CNF:
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_2
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨  b^{38, 4}_1
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ -p_114 ∨ -b^{38, 4}_0
c  in DIMACS:
 15875  15876 -15877 -114 -15878 0
 15875  15876 -15877 -114  15879 0
 15875  15876 -15877 -114 -15880 0

c  2+1 --> break 
c    (-b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧  p_114) -> break
c  in CNF:
c     b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 15875 -15876  15877 -114 1162 0


c  2-1 --> 1
c    (-b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧ -p_114) -> (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0)
c  in CNF:
c     b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_2
c     b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_1
c     b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨  b^{38, 4}_0
c  in DIMACS:
 15875 -15876  15877  114 -15878 0
 15875 -15876  15877  114 -15879 0
 15875 -15876  15877  114  15880 0

c  1-1 --> 0
c    (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0 ∧ -p_114) -> (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧ -b^{38, 4}_0)
c  in CNF:
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_2
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_1
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_0
c  in DIMACS:
 15875  15876 -15877  114 -15878 0
 15875  15876 -15877  114 -15879 0
 15875  15876 -15877  114 -15880 0

c  0-1 --> -1
c    (-b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧ -p_114) -> ( b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0)
c  in CNF:
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨  b^{38, 4}_2
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_1
c     b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨  b^{38, 4}_0
c  in DIMACS:
 15875  15876  15877  114  15878 0
 15875  15876  15877  114 -15879 0
 15875  15876  15877  114  15880 0

c  -1-1 --> -2
c    ( b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧  b^{38, 3}_0 ∧ -p_114) -> ( b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0)
c  in CNF:
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨  b^{38, 4}_2
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨  b^{38, 4}_1
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨  p_114 ∨ -b^{38, 4}_0
c  in DIMACS:
-15875  15876 -15877  114  15878 0
-15875  15876 -15877  114  15879 0
-15875  15876 -15877  114 -15880 0

c  -2-1 --> break 
c    ( b^{38, 3}_2 ∧  b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨  b^{38, 3}_0 ∨  p_114 ∨ break
c  in DIMACS:
-15875 -15876  15877  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 3}_2 ∧ -b^{38, 3}_1 ∧ -b^{38, 3}_0 ∧ true) 
c  in CNF:
c    -b^{38, 3}_2 ∨  b^{38, 3}_1 ∨  b^{38, 3}_0 ∨ false 
c  in DIMACS:
-15875  15876  15877  0

c  3 does not represent an automaton state.
c    -(-b^{38, 3}_2 ∧  b^{38, 3}_1 ∧  b^{38, 3}_0 ∧ true) 
c  in CNF:
c     b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ false 
c  in DIMACS:
 15875 -15876 -15877  0
c  -3 does not represent an automaton state.
c    -( b^{38, 3}_2 ∧  b^{38, 3}_1 ∧  b^{38, 3}_0 ∧ true) 
c  in CNF:
c    -b^{38, 3}_2 ∨ -b^{38, 3}_1 ∨ -b^{38, 3}_0 ∨ false 
c  in DIMACS:
-15875 -15876 -15877  0

c i = 4
c  -2+1 --> -1
c    ( b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧  p_152) -> ( b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0)
c  in CNF:
c    -b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨  b^{38, 5}_2
c    -b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_1
c    -b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨  b^{38, 5}_0
c  in DIMACS:
-15878 -15879  15880 -152  15881 0
-15878 -15879  15880 -152 -15882 0
-15878 -15879  15880 -152  15883 0

c  -1+1 --> 0
c    ( b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0 ∧  p_152) -> (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧ -b^{38, 5}_0)
c  in CNF:
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_2
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_1
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_0
c  in DIMACS:
-15878  15879 -15880 -152 -15881 0
-15878  15879 -15880 -152 -15882 0
-15878  15879 -15880 -152 -15883 0

c  0+1 --> 1
c    (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧  p_152) -> (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0)
c  in CNF:
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_2
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_1
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨  b^{38, 5}_0
c  in DIMACS:
 15878  15879  15880 -152 -15881 0
 15878  15879  15880 -152 -15882 0
 15878  15879  15880 -152  15883 0

c  1+1 --> 2
c    (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0 ∧  p_152) -> (-b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0)
c  in CNF:
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_2
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨  b^{38, 5}_1
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ -p_152 ∨ -b^{38, 5}_0
c  in DIMACS:
 15878  15879 -15880 -152 -15881 0
 15878  15879 -15880 -152  15882 0
 15878  15879 -15880 -152 -15883 0

c  2+1 --> break 
c    (-b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧  p_152) -> break
c  in CNF:
c     b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 15878 -15879  15880 -152 1162 0


c  2-1 --> 1
c    (-b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧ -p_152) -> (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0)
c  in CNF:
c     b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_2
c     b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_1
c     b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨  b^{38, 5}_0
c  in DIMACS:
 15878 -15879  15880  152 -15881 0
 15878 -15879  15880  152 -15882 0
 15878 -15879  15880  152  15883 0

c  1-1 --> 0
c    (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0 ∧ -p_152) -> (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧ -b^{38, 5}_0)
c  in CNF:
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_2
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_1
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_0
c  in DIMACS:
 15878  15879 -15880  152 -15881 0
 15878  15879 -15880  152 -15882 0
 15878  15879 -15880  152 -15883 0

c  0-1 --> -1
c    (-b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧ -p_152) -> ( b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0)
c  in CNF:
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨  b^{38, 5}_2
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_1
c     b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨  b^{38, 5}_0
c  in DIMACS:
 15878  15879  15880  152  15881 0
 15878  15879  15880  152 -15882 0
 15878  15879  15880  152  15883 0

c  -1-1 --> -2
c    ( b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧  b^{38, 4}_0 ∧ -p_152) -> ( b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0)
c  in CNF:
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨  b^{38, 5}_2
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨  b^{38, 5}_1
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨  p_152 ∨ -b^{38, 5}_0
c  in DIMACS:
-15878  15879 -15880  152  15881 0
-15878  15879 -15880  152  15882 0
-15878  15879 -15880  152 -15883 0

c  -2-1 --> break 
c    ( b^{38, 4}_2 ∧  b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨  b^{38, 4}_0 ∨  p_152 ∨ break
c  in DIMACS:
-15878 -15879  15880  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 4}_2 ∧ -b^{38, 4}_1 ∧ -b^{38, 4}_0 ∧ true) 
c  in CNF:
c    -b^{38, 4}_2 ∨  b^{38, 4}_1 ∨  b^{38, 4}_0 ∨ false 
c  in DIMACS:
-15878  15879  15880  0

c  3 does not represent an automaton state.
c    -(-b^{38, 4}_2 ∧  b^{38, 4}_1 ∧  b^{38, 4}_0 ∧ true) 
c  in CNF:
c     b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ false 
c  in DIMACS:
 15878 -15879 -15880  0
c  -3 does not represent an automaton state.
c    -( b^{38, 4}_2 ∧  b^{38, 4}_1 ∧  b^{38, 4}_0 ∧ true) 
c  in CNF:
c    -b^{38, 4}_2 ∨ -b^{38, 4}_1 ∨ -b^{38, 4}_0 ∨ false 
c  in DIMACS:
-15878 -15879 -15880  0

c i = 5
c  -2+1 --> -1
c    ( b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧  p_190) -> ( b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0)
c  in CNF:
c    -b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨  b^{38, 6}_2
c    -b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_1
c    -b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨  b^{38, 6}_0
c  in DIMACS:
-15881 -15882  15883 -190  15884 0
-15881 -15882  15883 -190 -15885 0
-15881 -15882  15883 -190  15886 0

c  -1+1 --> 0
c    ( b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0 ∧  p_190) -> (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧ -b^{38, 6}_0)
c  in CNF:
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_2
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_1
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_0
c  in DIMACS:
-15881  15882 -15883 -190 -15884 0
-15881  15882 -15883 -190 -15885 0
-15881  15882 -15883 -190 -15886 0

c  0+1 --> 1
c    (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧  p_190) -> (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0)
c  in CNF:
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_2
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_1
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨  b^{38, 6}_0
c  in DIMACS:
 15881  15882  15883 -190 -15884 0
 15881  15882  15883 -190 -15885 0
 15881  15882  15883 -190  15886 0

c  1+1 --> 2
c    (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0 ∧  p_190) -> (-b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0)
c  in CNF:
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_2
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨  b^{38, 6}_1
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ -p_190 ∨ -b^{38, 6}_0
c  in DIMACS:
 15881  15882 -15883 -190 -15884 0
 15881  15882 -15883 -190  15885 0
 15881  15882 -15883 -190 -15886 0

c  2+1 --> break 
c    (-b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧  p_190) -> break
c  in CNF:
c     b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 15881 -15882  15883 -190 1162 0


c  2-1 --> 1
c    (-b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧ -p_190) -> (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0)
c  in CNF:
c     b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_2
c     b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_1
c     b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨  b^{38, 6}_0
c  in DIMACS:
 15881 -15882  15883  190 -15884 0
 15881 -15882  15883  190 -15885 0
 15881 -15882  15883  190  15886 0

c  1-1 --> 0
c    (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0 ∧ -p_190) -> (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧ -b^{38, 6}_0)
c  in CNF:
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_2
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_1
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_0
c  in DIMACS:
 15881  15882 -15883  190 -15884 0
 15881  15882 -15883  190 -15885 0
 15881  15882 -15883  190 -15886 0

c  0-1 --> -1
c    (-b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧ -p_190) -> ( b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0)
c  in CNF:
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨  b^{38, 6}_2
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_1
c     b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨  b^{38, 6}_0
c  in DIMACS:
 15881  15882  15883  190  15884 0
 15881  15882  15883  190 -15885 0
 15881  15882  15883  190  15886 0

c  -1-1 --> -2
c    ( b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧  b^{38, 5}_0 ∧ -p_190) -> ( b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0)
c  in CNF:
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨  b^{38, 6}_2
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨  b^{38, 6}_1
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨  p_190 ∨ -b^{38, 6}_0
c  in DIMACS:
-15881  15882 -15883  190  15884 0
-15881  15882 -15883  190  15885 0
-15881  15882 -15883  190 -15886 0

c  -2-1 --> break 
c    ( b^{38, 5}_2 ∧  b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨  b^{38, 5}_0 ∨  p_190 ∨ break
c  in DIMACS:
-15881 -15882  15883  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 5}_2 ∧ -b^{38, 5}_1 ∧ -b^{38, 5}_0 ∧ true) 
c  in CNF:
c    -b^{38, 5}_2 ∨  b^{38, 5}_1 ∨  b^{38, 5}_0 ∨ false 
c  in DIMACS:
-15881  15882  15883  0

c  3 does not represent an automaton state.
c    -(-b^{38, 5}_2 ∧  b^{38, 5}_1 ∧  b^{38, 5}_0 ∧ true) 
c  in CNF:
c     b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ false 
c  in DIMACS:
 15881 -15882 -15883  0
c  -3 does not represent an automaton state.
c    -( b^{38, 5}_2 ∧  b^{38, 5}_1 ∧  b^{38, 5}_0 ∧ true) 
c  in CNF:
c    -b^{38, 5}_2 ∨ -b^{38, 5}_1 ∨ -b^{38, 5}_0 ∨ false 
c  in DIMACS:
-15881 -15882 -15883  0

c i = 6
c  -2+1 --> -1
c    ( b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧  p_228) -> ( b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0)
c  in CNF:
c    -b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨  b^{38, 7}_2
c    -b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_1
c    -b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨  b^{38, 7}_0
c  in DIMACS:
-15884 -15885  15886 -228  15887 0
-15884 -15885  15886 -228 -15888 0
-15884 -15885  15886 -228  15889 0

c  -1+1 --> 0
c    ( b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0 ∧  p_228) -> (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧ -b^{38, 7}_0)
c  in CNF:
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_2
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_1
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_0
c  in DIMACS:
-15884  15885 -15886 -228 -15887 0
-15884  15885 -15886 -228 -15888 0
-15884  15885 -15886 -228 -15889 0

c  0+1 --> 1
c    (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧  p_228) -> (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0)
c  in CNF:
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_2
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_1
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨  b^{38, 7}_0
c  in DIMACS:
 15884  15885  15886 -228 -15887 0
 15884  15885  15886 -228 -15888 0
 15884  15885  15886 -228  15889 0

c  1+1 --> 2
c    (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0 ∧  p_228) -> (-b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0)
c  in CNF:
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_2
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨  b^{38, 7}_1
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ -p_228 ∨ -b^{38, 7}_0
c  in DIMACS:
 15884  15885 -15886 -228 -15887 0
 15884  15885 -15886 -228  15888 0
 15884  15885 -15886 -228 -15889 0

c  2+1 --> break 
c    (-b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧  p_228) -> break
c  in CNF:
c     b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 15884 -15885  15886 -228 1162 0


c  2-1 --> 1
c    (-b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧ -p_228) -> (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0)
c  in CNF:
c     b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_2
c     b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_1
c     b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨  b^{38, 7}_0
c  in DIMACS:
 15884 -15885  15886  228 -15887 0
 15884 -15885  15886  228 -15888 0
 15884 -15885  15886  228  15889 0

c  1-1 --> 0
c    (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0 ∧ -p_228) -> (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧ -b^{38, 7}_0)
c  in CNF:
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_2
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_1
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_0
c  in DIMACS:
 15884  15885 -15886  228 -15887 0
 15884  15885 -15886  228 -15888 0
 15884  15885 -15886  228 -15889 0

c  0-1 --> -1
c    (-b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧ -p_228) -> ( b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0)
c  in CNF:
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨  b^{38, 7}_2
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_1
c     b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨  b^{38, 7}_0
c  in DIMACS:
 15884  15885  15886  228  15887 0
 15884  15885  15886  228 -15888 0
 15884  15885  15886  228  15889 0

c  -1-1 --> -2
c    ( b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧  b^{38, 6}_0 ∧ -p_228) -> ( b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0)
c  in CNF:
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨  b^{38, 7}_2
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨  b^{38, 7}_1
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨  p_228 ∨ -b^{38, 7}_0
c  in DIMACS:
-15884  15885 -15886  228  15887 0
-15884  15885 -15886  228  15888 0
-15884  15885 -15886  228 -15889 0

c  -2-1 --> break 
c    ( b^{38, 6}_2 ∧  b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨  b^{38, 6}_0 ∨  p_228 ∨ break
c  in DIMACS:
-15884 -15885  15886  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 6}_2 ∧ -b^{38, 6}_1 ∧ -b^{38, 6}_0 ∧ true) 
c  in CNF:
c    -b^{38, 6}_2 ∨  b^{38, 6}_1 ∨  b^{38, 6}_0 ∨ false 
c  in DIMACS:
-15884  15885  15886  0

c  3 does not represent an automaton state.
c    -(-b^{38, 6}_2 ∧  b^{38, 6}_1 ∧  b^{38, 6}_0 ∧ true) 
c  in CNF:
c     b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ false 
c  in DIMACS:
 15884 -15885 -15886  0
c  -3 does not represent an automaton state.
c    -( b^{38, 6}_2 ∧  b^{38, 6}_1 ∧  b^{38, 6}_0 ∧ true) 
c  in CNF:
c    -b^{38, 6}_2 ∨ -b^{38, 6}_1 ∨ -b^{38, 6}_0 ∨ false 
c  in DIMACS:
-15884 -15885 -15886  0

c i = 7
c  -2+1 --> -1
c    ( b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧  p_266) -> ( b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0)
c  in CNF:
c    -b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨  b^{38, 8}_2
c    -b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_1
c    -b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨  b^{38, 8}_0
c  in DIMACS:
-15887 -15888  15889 -266  15890 0
-15887 -15888  15889 -266 -15891 0
-15887 -15888  15889 -266  15892 0

c  -1+1 --> 0
c    ( b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0 ∧  p_266) -> (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧ -b^{38, 8}_0)
c  in CNF:
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_2
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_1
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_0
c  in DIMACS:
-15887  15888 -15889 -266 -15890 0
-15887  15888 -15889 -266 -15891 0
-15887  15888 -15889 -266 -15892 0

c  0+1 --> 1
c    (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧  p_266) -> (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0)
c  in CNF:
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_2
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_1
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨  b^{38, 8}_0
c  in DIMACS:
 15887  15888  15889 -266 -15890 0
 15887  15888  15889 -266 -15891 0
 15887  15888  15889 -266  15892 0

c  1+1 --> 2
c    (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0 ∧  p_266) -> (-b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0)
c  in CNF:
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_2
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨  b^{38, 8}_1
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ -p_266 ∨ -b^{38, 8}_0
c  in DIMACS:
 15887  15888 -15889 -266 -15890 0
 15887  15888 -15889 -266  15891 0
 15887  15888 -15889 -266 -15892 0

c  2+1 --> break 
c    (-b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧  p_266) -> break
c  in CNF:
c     b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 15887 -15888  15889 -266 1162 0


c  2-1 --> 1
c    (-b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧ -p_266) -> (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0)
c  in CNF:
c     b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_2
c     b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_1
c     b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨  b^{38, 8}_0
c  in DIMACS:
 15887 -15888  15889  266 -15890 0
 15887 -15888  15889  266 -15891 0
 15887 -15888  15889  266  15892 0

c  1-1 --> 0
c    (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0 ∧ -p_266) -> (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧ -b^{38, 8}_0)
c  in CNF:
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_2
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_1
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_0
c  in DIMACS:
 15887  15888 -15889  266 -15890 0
 15887  15888 -15889  266 -15891 0
 15887  15888 -15889  266 -15892 0

c  0-1 --> -1
c    (-b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧ -p_266) -> ( b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0)
c  in CNF:
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨  b^{38, 8}_2
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_1
c     b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨  b^{38, 8}_0
c  in DIMACS:
 15887  15888  15889  266  15890 0
 15887  15888  15889  266 -15891 0
 15887  15888  15889  266  15892 0

c  -1-1 --> -2
c    ( b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧  b^{38, 7}_0 ∧ -p_266) -> ( b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0)
c  in CNF:
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨  b^{38, 8}_2
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨  b^{38, 8}_1
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨  p_266 ∨ -b^{38, 8}_0
c  in DIMACS:
-15887  15888 -15889  266  15890 0
-15887  15888 -15889  266  15891 0
-15887  15888 -15889  266 -15892 0

c  -2-1 --> break 
c    ( b^{38, 7}_2 ∧  b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨  b^{38, 7}_0 ∨  p_266 ∨ break
c  in DIMACS:
-15887 -15888  15889  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 7}_2 ∧ -b^{38, 7}_1 ∧ -b^{38, 7}_0 ∧ true) 
c  in CNF:
c    -b^{38, 7}_2 ∨  b^{38, 7}_1 ∨  b^{38, 7}_0 ∨ false 
c  in DIMACS:
-15887  15888  15889  0

c  3 does not represent an automaton state.
c    -(-b^{38, 7}_2 ∧  b^{38, 7}_1 ∧  b^{38, 7}_0 ∧ true) 
c  in CNF:
c     b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ false 
c  in DIMACS:
 15887 -15888 -15889  0
c  -3 does not represent an automaton state.
c    -( b^{38, 7}_2 ∧  b^{38, 7}_1 ∧  b^{38, 7}_0 ∧ true) 
c  in CNF:
c    -b^{38, 7}_2 ∨ -b^{38, 7}_1 ∨ -b^{38, 7}_0 ∨ false 
c  in DIMACS:
-15887 -15888 -15889  0

c i = 8
c  -2+1 --> -1
c    ( b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧  p_304) -> ( b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0)
c  in CNF:
c    -b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨  b^{38, 9}_2
c    -b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_1
c    -b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨  b^{38, 9}_0
c  in DIMACS:
-15890 -15891  15892 -304  15893 0
-15890 -15891  15892 -304 -15894 0
-15890 -15891  15892 -304  15895 0

c  -1+1 --> 0
c    ( b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0 ∧  p_304) -> (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧ -b^{38, 9}_0)
c  in CNF:
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_2
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_1
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_0
c  in DIMACS:
-15890  15891 -15892 -304 -15893 0
-15890  15891 -15892 -304 -15894 0
-15890  15891 -15892 -304 -15895 0

c  0+1 --> 1
c    (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧  p_304) -> (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0)
c  in CNF:
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_2
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_1
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨  b^{38, 9}_0
c  in DIMACS:
 15890  15891  15892 -304 -15893 0
 15890  15891  15892 -304 -15894 0
 15890  15891  15892 -304  15895 0

c  1+1 --> 2
c    (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0 ∧  p_304) -> (-b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0)
c  in CNF:
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_2
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨  b^{38, 9}_1
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ -p_304 ∨ -b^{38, 9}_0
c  in DIMACS:
 15890  15891 -15892 -304 -15893 0
 15890  15891 -15892 -304  15894 0
 15890  15891 -15892 -304 -15895 0

c  2+1 --> break 
c    (-b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧  p_304) -> break
c  in CNF:
c     b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 15890 -15891  15892 -304 1162 0


c  2-1 --> 1
c    (-b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧ -p_304) -> (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0)
c  in CNF:
c     b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_2
c     b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_1
c     b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨  b^{38, 9}_0
c  in DIMACS:
 15890 -15891  15892  304 -15893 0
 15890 -15891  15892  304 -15894 0
 15890 -15891  15892  304  15895 0

c  1-1 --> 0
c    (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0 ∧ -p_304) -> (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧ -b^{38, 9}_0)
c  in CNF:
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_2
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_1
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_0
c  in DIMACS:
 15890  15891 -15892  304 -15893 0
 15890  15891 -15892  304 -15894 0
 15890  15891 -15892  304 -15895 0

c  0-1 --> -1
c    (-b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧ -p_304) -> ( b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0)
c  in CNF:
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨  b^{38, 9}_2
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_1
c     b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨  b^{38, 9}_0
c  in DIMACS:
 15890  15891  15892  304  15893 0
 15890  15891  15892  304 -15894 0
 15890  15891  15892  304  15895 0

c  -1-1 --> -2
c    ( b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧  b^{38, 8}_0 ∧ -p_304) -> ( b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0)
c  in CNF:
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨  b^{38, 9}_2
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨  b^{38, 9}_1
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨  p_304 ∨ -b^{38, 9}_0
c  in DIMACS:
-15890  15891 -15892  304  15893 0
-15890  15891 -15892  304  15894 0
-15890  15891 -15892  304 -15895 0

c  -2-1 --> break 
c    ( b^{38, 8}_2 ∧  b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨  b^{38, 8}_0 ∨  p_304 ∨ break
c  in DIMACS:
-15890 -15891  15892  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 8}_2 ∧ -b^{38, 8}_1 ∧ -b^{38, 8}_0 ∧ true) 
c  in CNF:
c    -b^{38, 8}_2 ∨  b^{38, 8}_1 ∨  b^{38, 8}_0 ∨ false 
c  in DIMACS:
-15890  15891  15892  0

c  3 does not represent an automaton state.
c    -(-b^{38, 8}_2 ∧  b^{38, 8}_1 ∧  b^{38, 8}_0 ∧ true) 
c  in CNF:
c     b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ false 
c  in DIMACS:
 15890 -15891 -15892  0
c  -3 does not represent an automaton state.
c    -( b^{38, 8}_2 ∧  b^{38, 8}_1 ∧  b^{38, 8}_0 ∧ true) 
c  in CNF:
c    -b^{38, 8}_2 ∨ -b^{38, 8}_1 ∨ -b^{38, 8}_0 ∨ false 
c  in DIMACS:
-15890 -15891 -15892  0

c i = 9
c  -2+1 --> -1
c    ( b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧  p_342) -> ( b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0)
c  in CNF:
c    -b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨  b^{38, 10}_2
c    -b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_1
c    -b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨  b^{38, 10}_0
c  in DIMACS:
-15893 -15894  15895 -342  15896 0
-15893 -15894  15895 -342 -15897 0
-15893 -15894  15895 -342  15898 0

c  -1+1 --> 0
c    ( b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0 ∧  p_342) -> (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧ -b^{38, 10}_0)
c  in CNF:
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_2
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_1
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_0
c  in DIMACS:
-15893  15894 -15895 -342 -15896 0
-15893  15894 -15895 -342 -15897 0
-15893  15894 -15895 -342 -15898 0

c  0+1 --> 1
c    (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧  p_342) -> (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0)
c  in CNF:
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_2
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_1
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨  b^{38, 10}_0
c  in DIMACS:
 15893  15894  15895 -342 -15896 0
 15893  15894  15895 -342 -15897 0
 15893  15894  15895 -342  15898 0

c  1+1 --> 2
c    (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0 ∧  p_342) -> (-b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0)
c  in CNF:
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_2
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨  b^{38, 10}_1
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ -p_342 ∨ -b^{38, 10}_0
c  in DIMACS:
 15893  15894 -15895 -342 -15896 0
 15893  15894 -15895 -342  15897 0
 15893  15894 -15895 -342 -15898 0

c  2+1 --> break 
c    (-b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧  p_342) -> break
c  in CNF:
c     b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 15893 -15894  15895 -342 1162 0


c  2-1 --> 1
c    (-b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧ -p_342) -> (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0)
c  in CNF:
c     b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_2
c     b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_1
c     b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨  b^{38, 10}_0
c  in DIMACS:
 15893 -15894  15895  342 -15896 0
 15893 -15894  15895  342 -15897 0
 15893 -15894  15895  342  15898 0

c  1-1 --> 0
c    (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0 ∧ -p_342) -> (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧ -b^{38, 10}_0)
c  in CNF:
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_2
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_1
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_0
c  in DIMACS:
 15893  15894 -15895  342 -15896 0
 15893  15894 -15895  342 -15897 0
 15893  15894 -15895  342 -15898 0

c  0-1 --> -1
c    (-b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧ -p_342) -> ( b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0)
c  in CNF:
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨  b^{38, 10}_2
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_1
c     b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨  b^{38, 10}_0
c  in DIMACS:
 15893  15894  15895  342  15896 0
 15893  15894  15895  342 -15897 0
 15893  15894  15895  342  15898 0

c  -1-1 --> -2
c    ( b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧  b^{38, 9}_0 ∧ -p_342) -> ( b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0)
c  in CNF:
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨  b^{38, 10}_2
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨  b^{38, 10}_1
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨  p_342 ∨ -b^{38, 10}_0
c  in DIMACS:
-15893  15894 -15895  342  15896 0
-15893  15894 -15895  342  15897 0
-15893  15894 -15895  342 -15898 0

c  -2-1 --> break 
c    ( b^{38, 9}_2 ∧  b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨  b^{38, 9}_0 ∨  p_342 ∨ break
c  in DIMACS:
-15893 -15894  15895  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 9}_2 ∧ -b^{38, 9}_1 ∧ -b^{38, 9}_0 ∧ true) 
c  in CNF:
c    -b^{38, 9}_2 ∨  b^{38, 9}_1 ∨  b^{38, 9}_0 ∨ false 
c  in DIMACS:
-15893  15894  15895  0

c  3 does not represent an automaton state.
c    -(-b^{38, 9}_2 ∧  b^{38, 9}_1 ∧  b^{38, 9}_0 ∧ true) 
c  in CNF:
c     b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ false 
c  in DIMACS:
 15893 -15894 -15895  0
c  -3 does not represent an automaton state.
c    -( b^{38, 9}_2 ∧  b^{38, 9}_1 ∧  b^{38, 9}_0 ∧ true) 
c  in CNF:
c    -b^{38, 9}_2 ∨ -b^{38, 9}_1 ∨ -b^{38, 9}_0 ∨ false 
c  in DIMACS:
-15893 -15894 -15895  0

c i = 10
c  -2+1 --> -1
c    ( b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧  p_380) -> ( b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0)
c  in CNF:
c    -b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨  b^{38, 11}_2
c    -b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_1
c    -b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨  b^{38, 11}_0
c  in DIMACS:
-15896 -15897  15898 -380  15899 0
-15896 -15897  15898 -380 -15900 0
-15896 -15897  15898 -380  15901 0

c  -1+1 --> 0
c    ( b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0 ∧  p_380) -> (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧ -b^{38, 11}_0)
c  in CNF:
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_2
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_1
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_0
c  in DIMACS:
-15896  15897 -15898 -380 -15899 0
-15896  15897 -15898 -380 -15900 0
-15896  15897 -15898 -380 -15901 0

c  0+1 --> 1
c    (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧  p_380) -> (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0)
c  in CNF:
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_2
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_1
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨  b^{38, 11}_0
c  in DIMACS:
 15896  15897  15898 -380 -15899 0
 15896  15897  15898 -380 -15900 0
 15896  15897  15898 -380  15901 0

c  1+1 --> 2
c    (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0 ∧  p_380) -> (-b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0)
c  in CNF:
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_2
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨  b^{38, 11}_1
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ -p_380 ∨ -b^{38, 11}_0
c  in DIMACS:
 15896  15897 -15898 -380 -15899 0
 15896  15897 -15898 -380  15900 0
 15896  15897 -15898 -380 -15901 0

c  2+1 --> break 
c    (-b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧  p_380) -> break
c  in CNF:
c     b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 15896 -15897  15898 -380 1162 0


c  2-1 --> 1
c    (-b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧ -p_380) -> (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0)
c  in CNF:
c     b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_2
c     b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_1
c     b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨  b^{38, 11}_0
c  in DIMACS:
 15896 -15897  15898  380 -15899 0
 15896 -15897  15898  380 -15900 0
 15896 -15897  15898  380  15901 0

c  1-1 --> 0
c    (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0 ∧ -p_380) -> (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧ -b^{38, 11}_0)
c  in CNF:
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_2
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_1
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_0
c  in DIMACS:
 15896  15897 -15898  380 -15899 0
 15896  15897 -15898  380 -15900 0
 15896  15897 -15898  380 -15901 0

c  0-1 --> -1
c    (-b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧ -p_380) -> ( b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0)
c  in CNF:
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨  b^{38, 11}_2
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_1
c     b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨  b^{38, 11}_0
c  in DIMACS:
 15896  15897  15898  380  15899 0
 15896  15897  15898  380 -15900 0
 15896  15897  15898  380  15901 0

c  -1-1 --> -2
c    ( b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧  b^{38, 10}_0 ∧ -p_380) -> ( b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0)
c  in CNF:
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨  b^{38, 11}_2
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨  b^{38, 11}_1
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨  p_380 ∨ -b^{38, 11}_0
c  in DIMACS:
-15896  15897 -15898  380  15899 0
-15896  15897 -15898  380  15900 0
-15896  15897 -15898  380 -15901 0

c  -2-1 --> break 
c    ( b^{38, 10}_2 ∧  b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨  b^{38, 10}_0 ∨  p_380 ∨ break
c  in DIMACS:
-15896 -15897  15898  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 10}_2 ∧ -b^{38, 10}_1 ∧ -b^{38, 10}_0 ∧ true) 
c  in CNF:
c    -b^{38, 10}_2 ∨  b^{38, 10}_1 ∨  b^{38, 10}_0 ∨ false 
c  in DIMACS:
-15896  15897  15898  0

c  3 does not represent an automaton state.
c    -(-b^{38, 10}_2 ∧  b^{38, 10}_1 ∧  b^{38, 10}_0 ∧ true) 
c  in CNF:
c     b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ false 
c  in DIMACS:
 15896 -15897 -15898  0
c  -3 does not represent an automaton state.
c    -( b^{38, 10}_2 ∧  b^{38, 10}_1 ∧  b^{38, 10}_0 ∧ true) 
c  in CNF:
c    -b^{38, 10}_2 ∨ -b^{38, 10}_1 ∨ -b^{38, 10}_0 ∨ false 
c  in DIMACS:
-15896 -15897 -15898  0

c i = 11
c  -2+1 --> -1
c    ( b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧  p_418) -> ( b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0)
c  in CNF:
c    -b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨  b^{38, 12}_2
c    -b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_1
c    -b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨  b^{38, 12}_0
c  in DIMACS:
-15899 -15900  15901 -418  15902 0
-15899 -15900  15901 -418 -15903 0
-15899 -15900  15901 -418  15904 0

c  -1+1 --> 0
c    ( b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0 ∧  p_418) -> (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧ -b^{38, 12}_0)
c  in CNF:
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_2
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_1
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_0
c  in DIMACS:
-15899  15900 -15901 -418 -15902 0
-15899  15900 -15901 -418 -15903 0
-15899  15900 -15901 -418 -15904 0

c  0+1 --> 1
c    (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧  p_418) -> (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0)
c  in CNF:
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_2
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_1
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨  b^{38, 12}_0
c  in DIMACS:
 15899  15900  15901 -418 -15902 0
 15899  15900  15901 -418 -15903 0
 15899  15900  15901 -418  15904 0

c  1+1 --> 2
c    (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0 ∧  p_418) -> (-b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0)
c  in CNF:
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_2
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨  b^{38, 12}_1
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ -p_418 ∨ -b^{38, 12}_0
c  in DIMACS:
 15899  15900 -15901 -418 -15902 0
 15899  15900 -15901 -418  15903 0
 15899  15900 -15901 -418 -15904 0

c  2+1 --> break 
c    (-b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧  p_418) -> break
c  in CNF:
c     b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 15899 -15900  15901 -418 1162 0


c  2-1 --> 1
c    (-b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧ -p_418) -> (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0)
c  in CNF:
c     b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_2
c     b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_1
c     b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨  b^{38, 12}_0
c  in DIMACS:
 15899 -15900  15901  418 -15902 0
 15899 -15900  15901  418 -15903 0
 15899 -15900  15901  418  15904 0

c  1-1 --> 0
c    (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0 ∧ -p_418) -> (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧ -b^{38, 12}_0)
c  in CNF:
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_2
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_1
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_0
c  in DIMACS:
 15899  15900 -15901  418 -15902 0
 15899  15900 -15901  418 -15903 0
 15899  15900 -15901  418 -15904 0

c  0-1 --> -1
c    (-b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧ -p_418) -> ( b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0)
c  in CNF:
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨  b^{38, 12}_2
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_1
c     b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨  b^{38, 12}_0
c  in DIMACS:
 15899  15900  15901  418  15902 0
 15899  15900  15901  418 -15903 0
 15899  15900  15901  418  15904 0

c  -1-1 --> -2
c    ( b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧  b^{38, 11}_0 ∧ -p_418) -> ( b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0)
c  in CNF:
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨  b^{38, 12}_2
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨  b^{38, 12}_1
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨  p_418 ∨ -b^{38, 12}_0
c  in DIMACS:
-15899  15900 -15901  418  15902 0
-15899  15900 -15901  418  15903 0
-15899  15900 -15901  418 -15904 0

c  -2-1 --> break 
c    ( b^{38, 11}_2 ∧  b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨  b^{38, 11}_0 ∨  p_418 ∨ break
c  in DIMACS:
-15899 -15900  15901  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 11}_2 ∧ -b^{38, 11}_1 ∧ -b^{38, 11}_0 ∧ true) 
c  in CNF:
c    -b^{38, 11}_2 ∨  b^{38, 11}_1 ∨  b^{38, 11}_0 ∨ false 
c  in DIMACS:
-15899  15900  15901  0

c  3 does not represent an automaton state.
c    -(-b^{38, 11}_2 ∧  b^{38, 11}_1 ∧  b^{38, 11}_0 ∧ true) 
c  in CNF:
c     b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ false 
c  in DIMACS:
 15899 -15900 -15901  0
c  -3 does not represent an automaton state.
c    -( b^{38, 11}_2 ∧  b^{38, 11}_1 ∧  b^{38, 11}_0 ∧ true) 
c  in CNF:
c    -b^{38, 11}_2 ∨ -b^{38, 11}_1 ∨ -b^{38, 11}_0 ∨ false 
c  in DIMACS:
-15899 -15900 -15901  0

c i = 12
c  -2+1 --> -1
c    ( b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧  p_456) -> ( b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0)
c  in CNF:
c    -b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨  b^{38, 13}_2
c    -b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_1
c    -b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨  b^{38, 13}_0
c  in DIMACS:
-15902 -15903  15904 -456  15905 0
-15902 -15903  15904 -456 -15906 0
-15902 -15903  15904 -456  15907 0

c  -1+1 --> 0
c    ( b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0 ∧  p_456) -> (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧ -b^{38, 13}_0)
c  in CNF:
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_2
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_1
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_0
c  in DIMACS:
-15902  15903 -15904 -456 -15905 0
-15902  15903 -15904 -456 -15906 0
-15902  15903 -15904 -456 -15907 0

c  0+1 --> 1
c    (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧  p_456) -> (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0)
c  in CNF:
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_2
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_1
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨  b^{38, 13}_0
c  in DIMACS:
 15902  15903  15904 -456 -15905 0
 15902  15903  15904 -456 -15906 0
 15902  15903  15904 -456  15907 0

c  1+1 --> 2
c    (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0 ∧  p_456) -> (-b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0)
c  in CNF:
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_2
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨  b^{38, 13}_1
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ -p_456 ∨ -b^{38, 13}_0
c  in DIMACS:
 15902  15903 -15904 -456 -15905 0
 15902  15903 -15904 -456  15906 0
 15902  15903 -15904 -456 -15907 0

c  2+1 --> break 
c    (-b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧  p_456) -> break
c  in CNF:
c     b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 15902 -15903  15904 -456 1162 0


c  2-1 --> 1
c    (-b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧ -p_456) -> (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0)
c  in CNF:
c     b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_2
c     b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_1
c     b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨  b^{38, 13}_0
c  in DIMACS:
 15902 -15903  15904  456 -15905 0
 15902 -15903  15904  456 -15906 0
 15902 -15903  15904  456  15907 0

c  1-1 --> 0
c    (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0 ∧ -p_456) -> (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧ -b^{38, 13}_0)
c  in CNF:
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_2
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_1
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_0
c  in DIMACS:
 15902  15903 -15904  456 -15905 0
 15902  15903 -15904  456 -15906 0
 15902  15903 -15904  456 -15907 0

c  0-1 --> -1
c    (-b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧ -p_456) -> ( b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0)
c  in CNF:
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨  b^{38, 13}_2
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_1
c     b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨  b^{38, 13}_0
c  in DIMACS:
 15902  15903  15904  456  15905 0
 15902  15903  15904  456 -15906 0
 15902  15903  15904  456  15907 0

c  -1-1 --> -2
c    ( b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧  b^{38, 12}_0 ∧ -p_456) -> ( b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0)
c  in CNF:
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨  b^{38, 13}_2
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨  b^{38, 13}_1
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨  p_456 ∨ -b^{38, 13}_0
c  in DIMACS:
-15902  15903 -15904  456  15905 0
-15902  15903 -15904  456  15906 0
-15902  15903 -15904  456 -15907 0

c  -2-1 --> break 
c    ( b^{38, 12}_2 ∧  b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨  b^{38, 12}_0 ∨  p_456 ∨ break
c  in DIMACS:
-15902 -15903  15904  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 12}_2 ∧ -b^{38, 12}_1 ∧ -b^{38, 12}_0 ∧ true) 
c  in CNF:
c    -b^{38, 12}_2 ∨  b^{38, 12}_1 ∨  b^{38, 12}_0 ∨ false 
c  in DIMACS:
-15902  15903  15904  0

c  3 does not represent an automaton state.
c    -(-b^{38, 12}_2 ∧  b^{38, 12}_1 ∧  b^{38, 12}_0 ∧ true) 
c  in CNF:
c     b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ false 
c  in DIMACS:
 15902 -15903 -15904  0
c  -3 does not represent an automaton state.
c    -( b^{38, 12}_2 ∧  b^{38, 12}_1 ∧  b^{38, 12}_0 ∧ true) 
c  in CNF:
c    -b^{38, 12}_2 ∨ -b^{38, 12}_1 ∨ -b^{38, 12}_0 ∨ false 
c  in DIMACS:
-15902 -15903 -15904  0

c i = 13
c  -2+1 --> -1
c    ( b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧  p_494) -> ( b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0)
c  in CNF:
c    -b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨  b^{38, 14}_2
c    -b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_1
c    -b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨  b^{38, 14}_0
c  in DIMACS:
-15905 -15906  15907 -494  15908 0
-15905 -15906  15907 -494 -15909 0
-15905 -15906  15907 -494  15910 0

c  -1+1 --> 0
c    ( b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0 ∧  p_494) -> (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧ -b^{38, 14}_0)
c  in CNF:
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_2
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_1
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_0
c  in DIMACS:
-15905  15906 -15907 -494 -15908 0
-15905  15906 -15907 -494 -15909 0
-15905  15906 -15907 -494 -15910 0

c  0+1 --> 1
c    (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧  p_494) -> (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0)
c  in CNF:
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_2
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_1
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨  b^{38, 14}_0
c  in DIMACS:
 15905  15906  15907 -494 -15908 0
 15905  15906  15907 -494 -15909 0
 15905  15906  15907 -494  15910 0

c  1+1 --> 2
c    (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0 ∧  p_494) -> (-b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0)
c  in CNF:
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_2
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨  b^{38, 14}_1
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ -p_494 ∨ -b^{38, 14}_0
c  in DIMACS:
 15905  15906 -15907 -494 -15908 0
 15905  15906 -15907 -494  15909 0
 15905  15906 -15907 -494 -15910 0

c  2+1 --> break 
c    (-b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧  p_494) -> break
c  in CNF:
c     b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 15905 -15906  15907 -494 1162 0


c  2-1 --> 1
c    (-b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧ -p_494) -> (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0)
c  in CNF:
c     b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_2
c     b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_1
c     b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨  b^{38, 14}_0
c  in DIMACS:
 15905 -15906  15907  494 -15908 0
 15905 -15906  15907  494 -15909 0
 15905 -15906  15907  494  15910 0

c  1-1 --> 0
c    (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0 ∧ -p_494) -> (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧ -b^{38, 14}_0)
c  in CNF:
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_2
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_1
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_0
c  in DIMACS:
 15905  15906 -15907  494 -15908 0
 15905  15906 -15907  494 -15909 0
 15905  15906 -15907  494 -15910 0

c  0-1 --> -1
c    (-b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧ -p_494) -> ( b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0)
c  in CNF:
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨  b^{38, 14}_2
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_1
c     b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨  b^{38, 14}_0
c  in DIMACS:
 15905  15906  15907  494  15908 0
 15905  15906  15907  494 -15909 0
 15905  15906  15907  494  15910 0

c  -1-1 --> -2
c    ( b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧  b^{38, 13}_0 ∧ -p_494) -> ( b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0)
c  in CNF:
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨  b^{38, 14}_2
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨  b^{38, 14}_1
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨  p_494 ∨ -b^{38, 14}_0
c  in DIMACS:
-15905  15906 -15907  494  15908 0
-15905  15906 -15907  494  15909 0
-15905  15906 -15907  494 -15910 0

c  -2-1 --> break 
c    ( b^{38, 13}_2 ∧  b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨  b^{38, 13}_0 ∨  p_494 ∨ break
c  in DIMACS:
-15905 -15906  15907  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 13}_2 ∧ -b^{38, 13}_1 ∧ -b^{38, 13}_0 ∧ true) 
c  in CNF:
c    -b^{38, 13}_2 ∨  b^{38, 13}_1 ∨  b^{38, 13}_0 ∨ false 
c  in DIMACS:
-15905  15906  15907  0

c  3 does not represent an automaton state.
c    -(-b^{38, 13}_2 ∧  b^{38, 13}_1 ∧  b^{38, 13}_0 ∧ true) 
c  in CNF:
c     b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ false 
c  in DIMACS:
 15905 -15906 -15907  0
c  -3 does not represent an automaton state.
c    -( b^{38, 13}_2 ∧  b^{38, 13}_1 ∧  b^{38, 13}_0 ∧ true) 
c  in CNF:
c    -b^{38, 13}_2 ∨ -b^{38, 13}_1 ∨ -b^{38, 13}_0 ∨ false 
c  in DIMACS:
-15905 -15906 -15907  0

c i = 14
c  -2+1 --> -1
c    ( b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧  p_532) -> ( b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0)
c  in CNF:
c    -b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨  b^{38, 15}_2
c    -b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_1
c    -b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨  b^{38, 15}_0
c  in DIMACS:
-15908 -15909  15910 -532  15911 0
-15908 -15909  15910 -532 -15912 0
-15908 -15909  15910 -532  15913 0

c  -1+1 --> 0
c    ( b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0 ∧  p_532) -> (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧ -b^{38, 15}_0)
c  in CNF:
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_2
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_1
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_0
c  in DIMACS:
-15908  15909 -15910 -532 -15911 0
-15908  15909 -15910 -532 -15912 0
-15908  15909 -15910 -532 -15913 0

c  0+1 --> 1
c    (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧  p_532) -> (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0)
c  in CNF:
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_2
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_1
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨  b^{38, 15}_0
c  in DIMACS:
 15908  15909  15910 -532 -15911 0
 15908  15909  15910 -532 -15912 0
 15908  15909  15910 -532  15913 0

c  1+1 --> 2
c    (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0 ∧  p_532) -> (-b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0)
c  in CNF:
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_2
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨  b^{38, 15}_1
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ -p_532 ∨ -b^{38, 15}_0
c  in DIMACS:
 15908  15909 -15910 -532 -15911 0
 15908  15909 -15910 -532  15912 0
 15908  15909 -15910 -532 -15913 0

c  2+1 --> break 
c    (-b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧  p_532) -> break
c  in CNF:
c     b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 15908 -15909  15910 -532 1162 0


c  2-1 --> 1
c    (-b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧ -p_532) -> (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0)
c  in CNF:
c     b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_2
c     b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_1
c     b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨  b^{38, 15}_0
c  in DIMACS:
 15908 -15909  15910  532 -15911 0
 15908 -15909  15910  532 -15912 0
 15908 -15909  15910  532  15913 0

c  1-1 --> 0
c    (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0 ∧ -p_532) -> (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧ -b^{38, 15}_0)
c  in CNF:
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_2
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_1
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_0
c  in DIMACS:
 15908  15909 -15910  532 -15911 0
 15908  15909 -15910  532 -15912 0
 15908  15909 -15910  532 -15913 0

c  0-1 --> -1
c    (-b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧ -p_532) -> ( b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0)
c  in CNF:
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨  b^{38, 15}_2
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_1
c     b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨  b^{38, 15}_0
c  in DIMACS:
 15908  15909  15910  532  15911 0
 15908  15909  15910  532 -15912 0
 15908  15909  15910  532  15913 0

c  -1-1 --> -2
c    ( b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧  b^{38, 14}_0 ∧ -p_532) -> ( b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0)
c  in CNF:
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨  b^{38, 15}_2
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨  b^{38, 15}_1
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨  p_532 ∨ -b^{38, 15}_0
c  in DIMACS:
-15908  15909 -15910  532  15911 0
-15908  15909 -15910  532  15912 0
-15908  15909 -15910  532 -15913 0

c  -2-1 --> break 
c    ( b^{38, 14}_2 ∧  b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨  b^{38, 14}_0 ∨  p_532 ∨ break
c  in DIMACS:
-15908 -15909  15910  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 14}_2 ∧ -b^{38, 14}_1 ∧ -b^{38, 14}_0 ∧ true) 
c  in CNF:
c    -b^{38, 14}_2 ∨  b^{38, 14}_1 ∨  b^{38, 14}_0 ∨ false 
c  in DIMACS:
-15908  15909  15910  0

c  3 does not represent an automaton state.
c    -(-b^{38, 14}_2 ∧  b^{38, 14}_1 ∧  b^{38, 14}_0 ∧ true) 
c  in CNF:
c     b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ false 
c  in DIMACS:
 15908 -15909 -15910  0
c  -3 does not represent an automaton state.
c    -( b^{38, 14}_2 ∧  b^{38, 14}_1 ∧  b^{38, 14}_0 ∧ true) 
c  in CNF:
c    -b^{38, 14}_2 ∨ -b^{38, 14}_1 ∨ -b^{38, 14}_0 ∨ false 
c  in DIMACS:
-15908 -15909 -15910  0

c i = 15
c  -2+1 --> -1
c    ( b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧  p_570) -> ( b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0)
c  in CNF:
c    -b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨  b^{38, 16}_2
c    -b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_1
c    -b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨  b^{38, 16}_0
c  in DIMACS:
-15911 -15912  15913 -570  15914 0
-15911 -15912  15913 -570 -15915 0
-15911 -15912  15913 -570  15916 0

c  -1+1 --> 0
c    ( b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0 ∧  p_570) -> (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧ -b^{38, 16}_0)
c  in CNF:
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_2
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_1
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_0
c  in DIMACS:
-15911  15912 -15913 -570 -15914 0
-15911  15912 -15913 -570 -15915 0
-15911  15912 -15913 -570 -15916 0

c  0+1 --> 1
c    (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧  p_570) -> (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0)
c  in CNF:
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_2
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_1
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨  b^{38, 16}_0
c  in DIMACS:
 15911  15912  15913 -570 -15914 0
 15911  15912  15913 -570 -15915 0
 15911  15912  15913 -570  15916 0

c  1+1 --> 2
c    (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0 ∧  p_570) -> (-b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0)
c  in CNF:
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_2
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨  b^{38, 16}_1
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ -p_570 ∨ -b^{38, 16}_0
c  in DIMACS:
 15911  15912 -15913 -570 -15914 0
 15911  15912 -15913 -570  15915 0
 15911  15912 -15913 -570 -15916 0

c  2+1 --> break 
c    (-b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧  p_570) -> break
c  in CNF:
c     b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 15911 -15912  15913 -570 1162 0


c  2-1 --> 1
c    (-b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧ -p_570) -> (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0)
c  in CNF:
c     b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_2
c     b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_1
c     b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨  b^{38, 16}_0
c  in DIMACS:
 15911 -15912  15913  570 -15914 0
 15911 -15912  15913  570 -15915 0
 15911 -15912  15913  570  15916 0

c  1-1 --> 0
c    (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0 ∧ -p_570) -> (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧ -b^{38, 16}_0)
c  in CNF:
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_2
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_1
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_0
c  in DIMACS:
 15911  15912 -15913  570 -15914 0
 15911  15912 -15913  570 -15915 0
 15911  15912 -15913  570 -15916 0

c  0-1 --> -1
c    (-b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧ -p_570) -> ( b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0)
c  in CNF:
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨  b^{38, 16}_2
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_1
c     b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨  b^{38, 16}_0
c  in DIMACS:
 15911  15912  15913  570  15914 0
 15911  15912  15913  570 -15915 0
 15911  15912  15913  570  15916 0

c  -1-1 --> -2
c    ( b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧  b^{38, 15}_0 ∧ -p_570) -> ( b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0)
c  in CNF:
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨  b^{38, 16}_2
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨  b^{38, 16}_1
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨  p_570 ∨ -b^{38, 16}_0
c  in DIMACS:
-15911  15912 -15913  570  15914 0
-15911  15912 -15913  570  15915 0
-15911  15912 -15913  570 -15916 0

c  -2-1 --> break 
c    ( b^{38, 15}_2 ∧  b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨  b^{38, 15}_0 ∨  p_570 ∨ break
c  in DIMACS:
-15911 -15912  15913  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 15}_2 ∧ -b^{38, 15}_1 ∧ -b^{38, 15}_0 ∧ true) 
c  in CNF:
c    -b^{38, 15}_2 ∨  b^{38, 15}_1 ∨  b^{38, 15}_0 ∨ false 
c  in DIMACS:
-15911  15912  15913  0

c  3 does not represent an automaton state.
c    -(-b^{38, 15}_2 ∧  b^{38, 15}_1 ∧  b^{38, 15}_0 ∧ true) 
c  in CNF:
c     b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ false 
c  in DIMACS:
 15911 -15912 -15913  0
c  -3 does not represent an automaton state.
c    -( b^{38, 15}_2 ∧  b^{38, 15}_1 ∧  b^{38, 15}_0 ∧ true) 
c  in CNF:
c    -b^{38, 15}_2 ∨ -b^{38, 15}_1 ∨ -b^{38, 15}_0 ∨ false 
c  in DIMACS:
-15911 -15912 -15913  0

c i = 16
c  -2+1 --> -1
c    ( b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧  p_608) -> ( b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0)
c  in CNF:
c    -b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨  b^{38, 17}_2
c    -b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_1
c    -b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨  b^{38, 17}_0
c  in DIMACS:
-15914 -15915  15916 -608  15917 0
-15914 -15915  15916 -608 -15918 0
-15914 -15915  15916 -608  15919 0

c  -1+1 --> 0
c    ( b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0 ∧  p_608) -> (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧ -b^{38, 17}_0)
c  in CNF:
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_2
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_1
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_0
c  in DIMACS:
-15914  15915 -15916 -608 -15917 0
-15914  15915 -15916 -608 -15918 0
-15914  15915 -15916 -608 -15919 0

c  0+1 --> 1
c    (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧  p_608) -> (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0)
c  in CNF:
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_2
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_1
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨  b^{38, 17}_0
c  in DIMACS:
 15914  15915  15916 -608 -15917 0
 15914  15915  15916 -608 -15918 0
 15914  15915  15916 -608  15919 0

c  1+1 --> 2
c    (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0 ∧  p_608) -> (-b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0)
c  in CNF:
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_2
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨  b^{38, 17}_1
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ -p_608 ∨ -b^{38, 17}_0
c  in DIMACS:
 15914  15915 -15916 -608 -15917 0
 15914  15915 -15916 -608  15918 0
 15914  15915 -15916 -608 -15919 0

c  2+1 --> break 
c    (-b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧  p_608) -> break
c  in CNF:
c     b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 15914 -15915  15916 -608 1162 0


c  2-1 --> 1
c    (-b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧ -p_608) -> (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0)
c  in CNF:
c     b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_2
c     b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_1
c     b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨  b^{38, 17}_0
c  in DIMACS:
 15914 -15915  15916  608 -15917 0
 15914 -15915  15916  608 -15918 0
 15914 -15915  15916  608  15919 0

c  1-1 --> 0
c    (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0 ∧ -p_608) -> (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧ -b^{38, 17}_0)
c  in CNF:
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_2
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_1
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_0
c  in DIMACS:
 15914  15915 -15916  608 -15917 0
 15914  15915 -15916  608 -15918 0
 15914  15915 -15916  608 -15919 0

c  0-1 --> -1
c    (-b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧ -p_608) -> ( b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0)
c  in CNF:
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨  b^{38, 17}_2
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_1
c     b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨  b^{38, 17}_0
c  in DIMACS:
 15914  15915  15916  608  15917 0
 15914  15915  15916  608 -15918 0
 15914  15915  15916  608  15919 0

c  -1-1 --> -2
c    ( b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧  b^{38, 16}_0 ∧ -p_608) -> ( b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0)
c  in CNF:
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨  b^{38, 17}_2
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨  b^{38, 17}_1
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨  p_608 ∨ -b^{38, 17}_0
c  in DIMACS:
-15914  15915 -15916  608  15917 0
-15914  15915 -15916  608  15918 0
-15914  15915 -15916  608 -15919 0

c  -2-1 --> break 
c    ( b^{38, 16}_2 ∧  b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨  b^{38, 16}_0 ∨  p_608 ∨ break
c  in DIMACS:
-15914 -15915  15916  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 16}_2 ∧ -b^{38, 16}_1 ∧ -b^{38, 16}_0 ∧ true) 
c  in CNF:
c    -b^{38, 16}_2 ∨  b^{38, 16}_1 ∨  b^{38, 16}_0 ∨ false 
c  in DIMACS:
-15914  15915  15916  0

c  3 does not represent an automaton state.
c    -(-b^{38, 16}_2 ∧  b^{38, 16}_1 ∧  b^{38, 16}_0 ∧ true) 
c  in CNF:
c     b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ false 
c  in DIMACS:
 15914 -15915 -15916  0
c  -3 does not represent an automaton state.
c    -( b^{38, 16}_2 ∧  b^{38, 16}_1 ∧  b^{38, 16}_0 ∧ true) 
c  in CNF:
c    -b^{38, 16}_2 ∨ -b^{38, 16}_1 ∨ -b^{38, 16}_0 ∨ false 
c  in DIMACS:
-15914 -15915 -15916  0

c i = 17
c  -2+1 --> -1
c    ( b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧  p_646) -> ( b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0)
c  in CNF:
c    -b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨  b^{38, 18}_2
c    -b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_1
c    -b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨  b^{38, 18}_0
c  in DIMACS:
-15917 -15918  15919 -646  15920 0
-15917 -15918  15919 -646 -15921 0
-15917 -15918  15919 -646  15922 0

c  -1+1 --> 0
c    ( b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0 ∧  p_646) -> (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧ -b^{38, 18}_0)
c  in CNF:
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_2
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_1
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_0
c  in DIMACS:
-15917  15918 -15919 -646 -15920 0
-15917  15918 -15919 -646 -15921 0
-15917  15918 -15919 -646 -15922 0

c  0+1 --> 1
c    (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧  p_646) -> (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0)
c  in CNF:
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_2
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_1
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨  b^{38, 18}_0
c  in DIMACS:
 15917  15918  15919 -646 -15920 0
 15917  15918  15919 -646 -15921 0
 15917  15918  15919 -646  15922 0

c  1+1 --> 2
c    (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0 ∧  p_646) -> (-b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0)
c  in CNF:
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_2
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨  b^{38, 18}_1
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ -p_646 ∨ -b^{38, 18}_0
c  in DIMACS:
 15917  15918 -15919 -646 -15920 0
 15917  15918 -15919 -646  15921 0
 15917  15918 -15919 -646 -15922 0

c  2+1 --> break 
c    (-b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧  p_646) -> break
c  in CNF:
c     b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 15917 -15918  15919 -646 1162 0


c  2-1 --> 1
c    (-b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧ -p_646) -> (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0)
c  in CNF:
c     b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_2
c     b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_1
c     b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨  b^{38, 18}_0
c  in DIMACS:
 15917 -15918  15919  646 -15920 0
 15917 -15918  15919  646 -15921 0
 15917 -15918  15919  646  15922 0

c  1-1 --> 0
c    (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0 ∧ -p_646) -> (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧ -b^{38, 18}_0)
c  in CNF:
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_2
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_1
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_0
c  in DIMACS:
 15917  15918 -15919  646 -15920 0
 15917  15918 -15919  646 -15921 0
 15917  15918 -15919  646 -15922 0

c  0-1 --> -1
c    (-b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧ -p_646) -> ( b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0)
c  in CNF:
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨  b^{38, 18}_2
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_1
c     b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨  b^{38, 18}_0
c  in DIMACS:
 15917  15918  15919  646  15920 0
 15917  15918  15919  646 -15921 0
 15917  15918  15919  646  15922 0

c  -1-1 --> -2
c    ( b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧  b^{38, 17}_0 ∧ -p_646) -> ( b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0)
c  in CNF:
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨  b^{38, 18}_2
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨  b^{38, 18}_1
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨  p_646 ∨ -b^{38, 18}_0
c  in DIMACS:
-15917  15918 -15919  646  15920 0
-15917  15918 -15919  646  15921 0
-15917  15918 -15919  646 -15922 0

c  -2-1 --> break 
c    ( b^{38, 17}_2 ∧  b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨  b^{38, 17}_0 ∨  p_646 ∨ break
c  in DIMACS:
-15917 -15918  15919  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 17}_2 ∧ -b^{38, 17}_1 ∧ -b^{38, 17}_0 ∧ true) 
c  in CNF:
c    -b^{38, 17}_2 ∨  b^{38, 17}_1 ∨  b^{38, 17}_0 ∨ false 
c  in DIMACS:
-15917  15918  15919  0

c  3 does not represent an automaton state.
c    -(-b^{38, 17}_2 ∧  b^{38, 17}_1 ∧  b^{38, 17}_0 ∧ true) 
c  in CNF:
c     b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ false 
c  in DIMACS:
 15917 -15918 -15919  0
c  -3 does not represent an automaton state.
c    -( b^{38, 17}_2 ∧  b^{38, 17}_1 ∧  b^{38, 17}_0 ∧ true) 
c  in CNF:
c    -b^{38, 17}_2 ∨ -b^{38, 17}_1 ∨ -b^{38, 17}_0 ∨ false 
c  in DIMACS:
-15917 -15918 -15919  0

c i = 18
c  -2+1 --> -1
c    ( b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧  p_684) -> ( b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0)
c  in CNF:
c    -b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨  b^{38, 19}_2
c    -b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_1
c    -b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨  b^{38, 19}_0
c  in DIMACS:
-15920 -15921  15922 -684  15923 0
-15920 -15921  15922 -684 -15924 0
-15920 -15921  15922 -684  15925 0

c  -1+1 --> 0
c    ( b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0 ∧  p_684) -> (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧ -b^{38, 19}_0)
c  in CNF:
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_2
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_1
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_0
c  in DIMACS:
-15920  15921 -15922 -684 -15923 0
-15920  15921 -15922 -684 -15924 0
-15920  15921 -15922 -684 -15925 0

c  0+1 --> 1
c    (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧  p_684) -> (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0)
c  in CNF:
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_2
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_1
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨  b^{38, 19}_0
c  in DIMACS:
 15920  15921  15922 -684 -15923 0
 15920  15921  15922 -684 -15924 0
 15920  15921  15922 -684  15925 0

c  1+1 --> 2
c    (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0 ∧  p_684) -> (-b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0)
c  in CNF:
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_2
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨  b^{38, 19}_1
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ -p_684 ∨ -b^{38, 19}_0
c  in DIMACS:
 15920  15921 -15922 -684 -15923 0
 15920  15921 -15922 -684  15924 0
 15920  15921 -15922 -684 -15925 0

c  2+1 --> break 
c    (-b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧  p_684) -> break
c  in CNF:
c     b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 15920 -15921  15922 -684 1162 0


c  2-1 --> 1
c    (-b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧ -p_684) -> (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0)
c  in CNF:
c     b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_2
c     b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_1
c     b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨  b^{38, 19}_0
c  in DIMACS:
 15920 -15921  15922  684 -15923 0
 15920 -15921  15922  684 -15924 0
 15920 -15921  15922  684  15925 0

c  1-1 --> 0
c    (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0 ∧ -p_684) -> (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧ -b^{38, 19}_0)
c  in CNF:
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_2
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_1
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_0
c  in DIMACS:
 15920  15921 -15922  684 -15923 0
 15920  15921 -15922  684 -15924 0
 15920  15921 -15922  684 -15925 0

c  0-1 --> -1
c    (-b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧ -p_684) -> ( b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0)
c  in CNF:
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨  b^{38, 19}_2
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_1
c     b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨  b^{38, 19}_0
c  in DIMACS:
 15920  15921  15922  684  15923 0
 15920  15921  15922  684 -15924 0
 15920  15921  15922  684  15925 0

c  -1-1 --> -2
c    ( b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧  b^{38, 18}_0 ∧ -p_684) -> ( b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0)
c  in CNF:
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨  b^{38, 19}_2
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨  b^{38, 19}_1
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨  p_684 ∨ -b^{38, 19}_0
c  in DIMACS:
-15920  15921 -15922  684  15923 0
-15920  15921 -15922  684  15924 0
-15920  15921 -15922  684 -15925 0

c  -2-1 --> break 
c    ( b^{38, 18}_2 ∧  b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨  b^{38, 18}_0 ∨  p_684 ∨ break
c  in DIMACS:
-15920 -15921  15922  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 18}_2 ∧ -b^{38, 18}_1 ∧ -b^{38, 18}_0 ∧ true) 
c  in CNF:
c    -b^{38, 18}_2 ∨  b^{38, 18}_1 ∨  b^{38, 18}_0 ∨ false 
c  in DIMACS:
-15920  15921  15922  0

c  3 does not represent an automaton state.
c    -(-b^{38, 18}_2 ∧  b^{38, 18}_1 ∧  b^{38, 18}_0 ∧ true) 
c  in CNF:
c     b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ false 
c  in DIMACS:
 15920 -15921 -15922  0
c  -3 does not represent an automaton state.
c    -( b^{38, 18}_2 ∧  b^{38, 18}_1 ∧  b^{38, 18}_0 ∧ true) 
c  in CNF:
c    -b^{38, 18}_2 ∨ -b^{38, 18}_1 ∨ -b^{38, 18}_0 ∨ false 
c  in DIMACS:
-15920 -15921 -15922  0

c i = 19
c  -2+1 --> -1
c    ( b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧  p_722) -> ( b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0)
c  in CNF:
c    -b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨  b^{38, 20}_2
c    -b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_1
c    -b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨  b^{38, 20}_0
c  in DIMACS:
-15923 -15924  15925 -722  15926 0
-15923 -15924  15925 -722 -15927 0
-15923 -15924  15925 -722  15928 0

c  -1+1 --> 0
c    ( b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0 ∧  p_722) -> (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧ -b^{38, 20}_0)
c  in CNF:
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_2
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_1
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_0
c  in DIMACS:
-15923  15924 -15925 -722 -15926 0
-15923  15924 -15925 -722 -15927 0
-15923  15924 -15925 -722 -15928 0

c  0+1 --> 1
c    (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧  p_722) -> (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0)
c  in CNF:
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_2
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_1
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨  b^{38, 20}_0
c  in DIMACS:
 15923  15924  15925 -722 -15926 0
 15923  15924  15925 -722 -15927 0
 15923  15924  15925 -722  15928 0

c  1+1 --> 2
c    (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0 ∧  p_722) -> (-b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0)
c  in CNF:
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_2
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨  b^{38, 20}_1
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ -p_722 ∨ -b^{38, 20}_0
c  in DIMACS:
 15923  15924 -15925 -722 -15926 0
 15923  15924 -15925 -722  15927 0
 15923  15924 -15925 -722 -15928 0

c  2+1 --> break 
c    (-b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧  p_722) -> break
c  in CNF:
c     b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ -p_722 ∨ break
c  in DIMACS:
 15923 -15924  15925 -722 1162 0


c  2-1 --> 1
c    (-b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧ -p_722) -> (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0)
c  in CNF:
c     b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_2
c     b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_1
c     b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨  b^{38, 20}_0
c  in DIMACS:
 15923 -15924  15925  722 -15926 0
 15923 -15924  15925  722 -15927 0
 15923 -15924  15925  722  15928 0

c  1-1 --> 0
c    (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0 ∧ -p_722) -> (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧ -b^{38, 20}_0)
c  in CNF:
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_2
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_1
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_0
c  in DIMACS:
 15923  15924 -15925  722 -15926 0
 15923  15924 -15925  722 -15927 0
 15923  15924 -15925  722 -15928 0

c  0-1 --> -1
c    (-b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧ -p_722) -> ( b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0)
c  in CNF:
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨  b^{38, 20}_2
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_1
c     b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨  b^{38, 20}_0
c  in DIMACS:
 15923  15924  15925  722  15926 0
 15923  15924  15925  722 -15927 0
 15923  15924  15925  722  15928 0

c  -1-1 --> -2
c    ( b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧  b^{38, 19}_0 ∧ -p_722) -> ( b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0)
c  in CNF:
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨  b^{38, 20}_2
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨  b^{38, 20}_1
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨  p_722 ∨ -b^{38, 20}_0
c  in DIMACS:
-15923  15924 -15925  722  15926 0
-15923  15924 -15925  722  15927 0
-15923  15924 -15925  722 -15928 0

c  -2-1 --> break 
c    ( b^{38, 19}_2 ∧  b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧ -p_722) -> break
c  in CNF:
c    -b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨  b^{38, 19}_0 ∨  p_722 ∨ break
c  in DIMACS:
-15923 -15924  15925  722 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 19}_2 ∧ -b^{38, 19}_1 ∧ -b^{38, 19}_0 ∧ true) 
c  in CNF:
c    -b^{38, 19}_2 ∨  b^{38, 19}_1 ∨  b^{38, 19}_0 ∨ false 
c  in DIMACS:
-15923  15924  15925  0

c  3 does not represent an automaton state.
c    -(-b^{38, 19}_2 ∧  b^{38, 19}_1 ∧  b^{38, 19}_0 ∧ true) 
c  in CNF:
c     b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ false 
c  in DIMACS:
 15923 -15924 -15925  0
c  -3 does not represent an automaton state.
c    -( b^{38, 19}_2 ∧  b^{38, 19}_1 ∧  b^{38, 19}_0 ∧ true) 
c  in CNF:
c    -b^{38, 19}_2 ∨ -b^{38, 19}_1 ∨ -b^{38, 19}_0 ∨ false 
c  in DIMACS:
-15923 -15924 -15925  0

c i = 20
c  -2+1 --> -1
c    ( b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧  p_760) -> ( b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0)
c  in CNF:
c    -b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨  b^{38, 21}_2
c    -b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_1
c    -b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨  b^{38, 21}_0
c  in DIMACS:
-15926 -15927  15928 -760  15929 0
-15926 -15927  15928 -760 -15930 0
-15926 -15927  15928 -760  15931 0

c  -1+1 --> 0
c    ( b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0 ∧  p_760) -> (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧ -b^{38, 21}_0)
c  in CNF:
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_2
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_1
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_0
c  in DIMACS:
-15926  15927 -15928 -760 -15929 0
-15926  15927 -15928 -760 -15930 0
-15926  15927 -15928 -760 -15931 0

c  0+1 --> 1
c    (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧  p_760) -> (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0)
c  in CNF:
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_2
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_1
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨  b^{38, 21}_0
c  in DIMACS:
 15926  15927  15928 -760 -15929 0
 15926  15927  15928 -760 -15930 0
 15926  15927  15928 -760  15931 0

c  1+1 --> 2
c    (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0 ∧  p_760) -> (-b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0)
c  in CNF:
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_2
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨  b^{38, 21}_1
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ -p_760 ∨ -b^{38, 21}_0
c  in DIMACS:
 15926  15927 -15928 -760 -15929 0
 15926  15927 -15928 -760  15930 0
 15926  15927 -15928 -760 -15931 0

c  2+1 --> break 
c    (-b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧  p_760) -> break
c  in CNF:
c     b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 15926 -15927  15928 -760 1162 0


c  2-1 --> 1
c    (-b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧ -p_760) -> (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0)
c  in CNF:
c     b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_2
c     b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_1
c     b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨  b^{38, 21}_0
c  in DIMACS:
 15926 -15927  15928  760 -15929 0
 15926 -15927  15928  760 -15930 0
 15926 -15927  15928  760  15931 0

c  1-1 --> 0
c    (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0 ∧ -p_760) -> (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧ -b^{38, 21}_0)
c  in CNF:
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_2
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_1
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_0
c  in DIMACS:
 15926  15927 -15928  760 -15929 0
 15926  15927 -15928  760 -15930 0
 15926  15927 -15928  760 -15931 0

c  0-1 --> -1
c    (-b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧ -p_760) -> ( b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0)
c  in CNF:
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨  b^{38, 21}_2
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_1
c     b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨  b^{38, 21}_0
c  in DIMACS:
 15926  15927  15928  760  15929 0
 15926  15927  15928  760 -15930 0
 15926  15927  15928  760  15931 0

c  -1-1 --> -2
c    ( b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧  b^{38, 20}_0 ∧ -p_760) -> ( b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0)
c  in CNF:
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨  b^{38, 21}_2
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨  b^{38, 21}_1
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨  p_760 ∨ -b^{38, 21}_0
c  in DIMACS:
-15926  15927 -15928  760  15929 0
-15926  15927 -15928  760  15930 0
-15926  15927 -15928  760 -15931 0

c  -2-1 --> break 
c    ( b^{38, 20}_2 ∧  b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨  b^{38, 20}_0 ∨  p_760 ∨ break
c  in DIMACS:
-15926 -15927  15928  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 20}_2 ∧ -b^{38, 20}_1 ∧ -b^{38, 20}_0 ∧ true) 
c  in CNF:
c    -b^{38, 20}_2 ∨  b^{38, 20}_1 ∨  b^{38, 20}_0 ∨ false 
c  in DIMACS:
-15926  15927  15928  0

c  3 does not represent an automaton state.
c    -(-b^{38, 20}_2 ∧  b^{38, 20}_1 ∧  b^{38, 20}_0 ∧ true) 
c  in CNF:
c     b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ false 
c  in DIMACS:
 15926 -15927 -15928  0
c  -3 does not represent an automaton state.
c    -( b^{38, 20}_2 ∧  b^{38, 20}_1 ∧  b^{38, 20}_0 ∧ true) 
c  in CNF:
c    -b^{38, 20}_2 ∨ -b^{38, 20}_1 ∨ -b^{38, 20}_0 ∨ false 
c  in DIMACS:
-15926 -15927 -15928  0

c i = 21
c  -2+1 --> -1
c    ( b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧  p_798) -> ( b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0)
c  in CNF:
c    -b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨  b^{38, 22}_2
c    -b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_1
c    -b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨  b^{38, 22}_0
c  in DIMACS:
-15929 -15930  15931 -798  15932 0
-15929 -15930  15931 -798 -15933 0
-15929 -15930  15931 -798  15934 0

c  -1+1 --> 0
c    ( b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0 ∧  p_798) -> (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧ -b^{38, 22}_0)
c  in CNF:
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_2
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_1
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_0
c  in DIMACS:
-15929  15930 -15931 -798 -15932 0
-15929  15930 -15931 -798 -15933 0
-15929  15930 -15931 -798 -15934 0

c  0+1 --> 1
c    (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧  p_798) -> (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0)
c  in CNF:
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_2
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_1
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨  b^{38, 22}_0
c  in DIMACS:
 15929  15930  15931 -798 -15932 0
 15929  15930  15931 -798 -15933 0
 15929  15930  15931 -798  15934 0

c  1+1 --> 2
c    (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0 ∧  p_798) -> (-b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0)
c  in CNF:
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_2
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨  b^{38, 22}_1
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ -p_798 ∨ -b^{38, 22}_0
c  in DIMACS:
 15929  15930 -15931 -798 -15932 0
 15929  15930 -15931 -798  15933 0
 15929  15930 -15931 -798 -15934 0

c  2+1 --> break 
c    (-b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧  p_798) -> break
c  in CNF:
c     b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 15929 -15930  15931 -798 1162 0


c  2-1 --> 1
c    (-b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧ -p_798) -> (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0)
c  in CNF:
c     b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_2
c     b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_1
c     b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨  b^{38, 22}_0
c  in DIMACS:
 15929 -15930  15931  798 -15932 0
 15929 -15930  15931  798 -15933 0
 15929 -15930  15931  798  15934 0

c  1-1 --> 0
c    (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0 ∧ -p_798) -> (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧ -b^{38, 22}_0)
c  in CNF:
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_2
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_1
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_0
c  in DIMACS:
 15929  15930 -15931  798 -15932 0
 15929  15930 -15931  798 -15933 0
 15929  15930 -15931  798 -15934 0

c  0-1 --> -1
c    (-b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧ -p_798) -> ( b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0)
c  in CNF:
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨  b^{38, 22}_2
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_1
c     b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨  b^{38, 22}_0
c  in DIMACS:
 15929  15930  15931  798  15932 0
 15929  15930  15931  798 -15933 0
 15929  15930  15931  798  15934 0

c  -1-1 --> -2
c    ( b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧  b^{38, 21}_0 ∧ -p_798) -> ( b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0)
c  in CNF:
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨  b^{38, 22}_2
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨  b^{38, 22}_1
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨  p_798 ∨ -b^{38, 22}_0
c  in DIMACS:
-15929  15930 -15931  798  15932 0
-15929  15930 -15931  798  15933 0
-15929  15930 -15931  798 -15934 0

c  -2-1 --> break 
c    ( b^{38, 21}_2 ∧  b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨  b^{38, 21}_0 ∨  p_798 ∨ break
c  in DIMACS:
-15929 -15930  15931  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 21}_2 ∧ -b^{38, 21}_1 ∧ -b^{38, 21}_0 ∧ true) 
c  in CNF:
c    -b^{38, 21}_2 ∨  b^{38, 21}_1 ∨  b^{38, 21}_0 ∨ false 
c  in DIMACS:
-15929  15930  15931  0

c  3 does not represent an automaton state.
c    -(-b^{38, 21}_2 ∧  b^{38, 21}_1 ∧  b^{38, 21}_0 ∧ true) 
c  in CNF:
c     b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ false 
c  in DIMACS:
 15929 -15930 -15931  0
c  -3 does not represent an automaton state.
c    -( b^{38, 21}_2 ∧  b^{38, 21}_1 ∧  b^{38, 21}_0 ∧ true) 
c  in CNF:
c    -b^{38, 21}_2 ∨ -b^{38, 21}_1 ∨ -b^{38, 21}_0 ∨ false 
c  in DIMACS:
-15929 -15930 -15931  0

c i = 22
c  -2+1 --> -1
c    ( b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧  p_836) -> ( b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0)
c  in CNF:
c    -b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨  b^{38, 23}_2
c    -b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_1
c    -b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨  b^{38, 23}_0
c  in DIMACS:
-15932 -15933  15934 -836  15935 0
-15932 -15933  15934 -836 -15936 0
-15932 -15933  15934 -836  15937 0

c  -1+1 --> 0
c    ( b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0 ∧  p_836) -> (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧ -b^{38, 23}_0)
c  in CNF:
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_2
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_1
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_0
c  in DIMACS:
-15932  15933 -15934 -836 -15935 0
-15932  15933 -15934 -836 -15936 0
-15932  15933 -15934 -836 -15937 0

c  0+1 --> 1
c    (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧  p_836) -> (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0)
c  in CNF:
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_2
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_1
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨  b^{38, 23}_0
c  in DIMACS:
 15932  15933  15934 -836 -15935 0
 15932  15933  15934 -836 -15936 0
 15932  15933  15934 -836  15937 0

c  1+1 --> 2
c    (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0 ∧  p_836) -> (-b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0)
c  in CNF:
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_2
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨  b^{38, 23}_1
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ -p_836 ∨ -b^{38, 23}_0
c  in DIMACS:
 15932  15933 -15934 -836 -15935 0
 15932  15933 -15934 -836  15936 0
 15932  15933 -15934 -836 -15937 0

c  2+1 --> break 
c    (-b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧  p_836) -> break
c  in CNF:
c     b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 15932 -15933  15934 -836 1162 0


c  2-1 --> 1
c    (-b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧ -p_836) -> (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0)
c  in CNF:
c     b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_2
c     b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_1
c     b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨  b^{38, 23}_0
c  in DIMACS:
 15932 -15933  15934  836 -15935 0
 15932 -15933  15934  836 -15936 0
 15932 -15933  15934  836  15937 0

c  1-1 --> 0
c    (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0 ∧ -p_836) -> (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧ -b^{38, 23}_0)
c  in CNF:
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_2
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_1
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_0
c  in DIMACS:
 15932  15933 -15934  836 -15935 0
 15932  15933 -15934  836 -15936 0
 15932  15933 -15934  836 -15937 0

c  0-1 --> -1
c    (-b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧ -p_836) -> ( b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0)
c  in CNF:
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨  b^{38, 23}_2
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_1
c     b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨  b^{38, 23}_0
c  in DIMACS:
 15932  15933  15934  836  15935 0
 15932  15933  15934  836 -15936 0
 15932  15933  15934  836  15937 0

c  -1-1 --> -2
c    ( b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧  b^{38, 22}_0 ∧ -p_836) -> ( b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0)
c  in CNF:
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨  b^{38, 23}_2
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨  b^{38, 23}_1
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨  p_836 ∨ -b^{38, 23}_0
c  in DIMACS:
-15932  15933 -15934  836  15935 0
-15932  15933 -15934  836  15936 0
-15932  15933 -15934  836 -15937 0

c  -2-1 --> break 
c    ( b^{38, 22}_2 ∧  b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨  b^{38, 22}_0 ∨  p_836 ∨ break
c  in DIMACS:
-15932 -15933  15934  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 22}_2 ∧ -b^{38, 22}_1 ∧ -b^{38, 22}_0 ∧ true) 
c  in CNF:
c    -b^{38, 22}_2 ∨  b^{38, 22}_1 ∨  b^{38, 22}_0 ∨ false 
c  in DIMACS:
-15932  15933  15934  0

c  3 does not represent an automaton state.
c    -(-b^{38, 22}_2 ∧  b^{38, 22}_1 ∧  b^{38, 22}_0 ∧ true) 
c  in CNF:
c     b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ false 
c  in DIMACS:
 15932 -15933 -15934  0
c  -3 does not represent an automaton state.
c    -( b^{38, 22}_2 ∧  b^{38, 22}_1 ∧  b^{38, 22}_0 ∧ true) 
c  in CNF:
c    -b^{38, 22}_2 ∨ -b^{38, 22}_1 ∨ -b^{38, 22}_0 ∨ false 
c  in DIMACS:
-15932 -15933 -15934  0

c i = 23
c  -2+1 --> -1
c    ( b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧  p_874) -> ( b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0)
c  in CNF:
c    -b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨  b^{38, 24}_2
c    -b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_1
c    -b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨  b^{38, 24}_0
c  in DIMACS:
-15935 -15936  15937 -874  15938 0
-15935 -15936  15937 -874 -15939 0
-15935 -15936  15937 -874  15940 0

c  -1+1 --> 0
c    ( b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0 ∧  p_874) -> (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧ -b^{38, 24}_0)
c  in CNF:
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_2
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_1
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_0
c  in DIMACS:
-15935  15936 -15937 -874 -15938 0
-15935  15936 -15937 -874 -15939 0
-15935  15936 -15937 -874 -15940 0

c  0+1 --> 1
c    (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧  p_874) -> (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0)
c  in CNF:
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_2
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_1
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨  b^{38, 24}_0
c  in DIMACS:
 15935  15936  15937 -874 -15938 0
 15935  15936  15937 -874 -15939 0
 15935  15936  15937 -874  15940 0

c  1+1 --> 2
c    (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0 ∧  p_874) -> (-b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0)
c  in CNF:
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_2
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨  b^{38, 24}_1
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ -p_874 ∨ -b^{38, 24}_0
c  in DIMACS:
 15935  15936 -15937 -874 -15938 0
 15935  15936 -15937 -874  15939 0
 15935  15936 -15937 -874 -15940 0

c  2+1 --> break 
c    (-b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧  p_874) -> break
c  in CNF:
c     b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 15935 -15936  15937 -874 1162 0


c  2-1 --> 1
c    (-b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧ -p_874) -> (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0)
c  in CNF:
c     b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_2
c     b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_1
c     b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨  b^{38, 24}_0
c  in DIMACS:
 15935 -15936  15937  874 -15938 0
 15935 -15936  15937  874 -15939 0
 15935 -15936  15937  874  15940 0

c  1-1 --> 0
c    (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0 ∧ -p_874) -> (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧ -b^{38, 24}_0)
c  in CNF:
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_2
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_1
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_0
c  in DIMACS:
 15935  15936 -15937  874 -15938 0
 15935  15936 -15937  874 -15939 0
 15935  15936 -15937  874 -15940 0

c  0-1 --> -1
c    (-b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧ -p_874) -> ( b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0)
c  in CNF:
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨  b^{38, 24}_2
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_1
c     b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨  b^{38, 24}_0
c  in DIMACS:
 15935  15936  15937  874  15938 0
 15935  15936  15937  874 -15939 0
 15935  15936  15937  874  15940 0

c  -1-1 --> -2
c    ( b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧  b^{38, 23}_0 ∧ -p_874) -> ( b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0)
c  in CNF:
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨  b^{38, 24}_2
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨  b^{38, 24}_1
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨  p_874 ∨ -b^{38, 24}_0
c  in DIMACS:
-15935  15936 -15937  874  15938 0
-15935  15936 -15937  874  15939 0
-15935  15936 -15937  874 -15940 0

c  -2-1 --> break 
c    ( b^{38, 23}_2 ∧  b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨  b^{38, 23}_0 ∨  p_874 ∨ break
c  in DIMACS:
-15935 -15936  15937  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 23}_2 ∧ -b^{38, 23}_1 ∧ -b^{38, 23}_0 ∧ true) 
c  in CNF:
c    -b^{38, 23}_2 ∨  b^{38, 23}_1 ∨  b^{38, 23}_0 ∨ false 
c  in DIMACS:
-15935  15936  15937  0

c  3 does not represent an automaton state.
c    -(-b^{38, 23}_2 ∧  b^{38, 23}_1 ∧  b^{38, 23}_0 ∧ true) 
c  in CNF:
c     b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ false 
c  in DIMACS:
 15935 -15936 -15937  0
c  -3 does not represent an automaton state.
c    -( b^{38, 23}_2 ∧  b^{38, 23}_1 ∧  b^{38, 23}_0 ∧ true) 
c  in CNF:
c    -b^{38, 23}_2 ∨ -b^{38, 23}_1 ∨ -b^{38, 23}_0 ∨ false 
c  in DIMACS:
-15935 -15936 -15937  0

c i = 24
c  -2+1 --> -1
c    ( b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧  p_912) -> ( b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0)
c  in CNF:
c    -b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨  b^{38, 25}_2
c    -b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_1
c    -b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨  b^{38, 25}_0
c  in DIMACS:
-15938 -15939  15940 -912  15941 0
-15938 -15939  15940 -912 -15942 0
-15938 -15939  15940 -912  15943 0

c  -1+1 --> 0
c    ( b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0 ∧  p_912) -> (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧ -b^{38, 25}_0)
c  in CNF:
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_2
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_1
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_0
c  in DIMACS:
-15938  15939 -15940 -912 -15941 0
-15938  15939 -15940 -912 -15942 0
-15938  15939 -15940 -912 -15943 0

c  0+1 --> 1
c    (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧  p_912) -> (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0)
c  in CNF:
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_2
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_1
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨  b^{38, 25}_0
c  in DIMACS:
 15938  15939  15940 -912 -15941 0
 15938  15939  15940 -912 -15942 0
 15938  15939  15940 -912  15943 0

c  1+1 --> 2
c    (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0 ∧  p_912) -> (-b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0)
c  in CNF:
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_2
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨  b^{38, 25}_1
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ -p_912 ∨ -b^{38, 25}_0
c  in DIMACS:
 15938  15939 -15940 -912 -15941 0
 15938  15939 -15940 -912  15942 0
 15938  15939 -15940 -912 -15943 0

c  2+1 --> break 
c    (-b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧  p_912) -> break
c  in CNF:
c     b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 15938 -15939  15940 -912 1162 0


c  2-1 --> 1
c    (-b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧ -p_912) -> (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0)
c  in CNF:
c     b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_2
c     b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_1
c     b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨  b^{38, 25}_0
c  in DIMACS:
 15938 -15939  15940  912 -15941 0
 15938 -15939  15940  912 -15942 0
 15938 -15939  15940  912  15943 0

c  1-1 --> 0
c    (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0 ∧ -p_912) -> (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧ -b^{38, 25}_0)
c  in CNF:
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_2
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_1
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_0
c  in DIMACS:
 15938  15939 -15940  912 -15941 0
 15938  15939 -15940  912 -15942 0
 15938  15939 -15940  912 -15943 0

c  0-1 --> -1
c    (-b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧ -p_912) -> ( b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0)
c  in CNF:
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨  b^{38, 25}_2
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_1
c     b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨  b^{38, 25}_0
c  in DIMACS:
 15938  15939  15940  912  15941 0
 15938  15939  15940  912 -15942 0
 15938  15939  15940  912  15943 0

c  -1-1 --> -2
c    ( b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧  b^{38, 24}_0 ∧ -p_912) -> ( b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0)
c  in CNF:
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨  b^{38, 25}_2
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨  b^{38, 25}_1
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨  p_912 ∨ -b^{38, 25}_0
c  in DIMACS:
-15938  15939 -15940  912  15941 0
-15938  15939 -15940  912  15942 0
-15938  15939 -15940  912 -15943 0

c  -2-1 --> break 
c    ( b^{38, 24}_2 ∧  b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨  b^{38, 24}_0 ∨  p_912 ∨ break
c  in DIMACS:
-15938 -15939  15940  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 24}_2 ∧ -b^{38, 24}_1 ∧ -b^{38, 24}_0 ∧ true) 
c  in CNF:
c    -b^{38, 24}_2 ∨  b^{38, 24}_1 ∨  b^{38, 24}_0 ∨ false 
c  in DIMACS:
-15938  15939  15940  0

c  3 does not represent an automaton state.
c    -(-b^{38, 24}_2 ∧  b^{38, 24}_1 ∧  b^{38, 24}_0 ∧ true) 
c  in CNF:
c     b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ false 
c  in DIMACS:
 15938 -15939 -15940  0
c  -3 does not represent an automaton state.
c    -( b^{38, 24}_2 ∧  b^{38, 24}_1 ∧  b^{38, 24}_0 ∧ true) 
c  in CNF:
c    -b^{38, 24}_2 ∨ -b^{38, 24}_1 ∨ -b^{38, 24}_0 ∨ false 
c  in DIMACS:
-15938 -15939 -15940  0

c i = 25
c  -2+1 --> -1
c    ( b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧  p_950) -> ( b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0)
c  in CNF:
c    -b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨  b^{38, 26}_2
c    -b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_1
c    -b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨  b^{38, 26}_0
c  in DIMACS:
-15941 -15942  15943 -950  15944 0
-15941 -15942  15943 -950 -15945 0
-15941 -15942  15943 -950  15946 0

c  -1+1 --> 0
c    ( b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0 ∧  p_950) -> (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧ -b^{38, 26}_0)
c  in CNF:
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_2
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_1
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_0
c  in DIMACS:
-15941  15942 -15943 -950 -15944 0
-15941  15942 -15943 -950 -15945 0
-15941  15942 -15943 -950 -15946 0

c  0+1 --> 1
c    (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧  p_950) -> (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0)
c  in CNF:
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_2
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_1
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨  b^{38, 26}_0
c  in DIMACS:
 15941  15942  15943 -950 -15944 0
 15941  15942  15943 -950 -15945 0
 15941  15942  15943 -950  15946 0

c  1+1 --> 2
c    (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0 ∧  p_950) -> (-b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0)
c  in CNF:
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_2
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨  b^{38, 26}_1
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ -p_950 ∨ -b^{38, 26}_0
c  in DIMACS:
 15941  15942 -15943 -950 -15944 0
 15941  15942 -15943 -950  15945 0
 15941  15942 -15943 -950 -15946 0

c  2+1 --> break 
c    (-b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧  p_950) -> break
c  in CNF:
c     b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 15941 -15942  15943 -950 1162 0


c  2-1 --> 1
c    (-b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧ -p_950) -> (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0)
c  in CNF:
c     b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_2
c     b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_1
c     b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨  b^{38, 26}_0
c  in DIMACS:
 15941 -15942  15943  950 -15944 0
 15941 -15942  15943  950 -15945 0
 15941 -15942  15943  950  15946 0

c  1-1 --> 0
c    (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0 ∧ -p_950) -> (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧ -b^{38, 26}_0)
c  in CNF:
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_2
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_1
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_0
c  in DIMACS:
 15941  15942 -15943  950 -15944 0
 15941  15942 -15943  950 -15945 0
 15941  15942 -15943  950 -15946 0

c  0-1 --> -1
c    (-b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧ -p_950) -> ( b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0)
c  in CNF:
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨  b^{38, 26}_2
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_1
c     b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨  b^{38, 26}_0
c  in DIMACS:
 15941  15942  15943  950  15944 0
 15941  15942  15943  950 -15945 0
 15941  15942  15943  950  15946 0

c  -1-1 --> -2
c    ( b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧  b^{38, 25}_0 ∧ -p_950) -> ( b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0)
c  in CNF:
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨  b^{38, 26}_2
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨  b^{38, 26}_1
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨  p_950 ∨ -b^{38, 26}_0
c  in DIMACS:
-15941  15942 -15943  950  15944 0
-15941  15942 -15943  950  15945 0
-15941  15942 -15943  950 -15946 0

c  -2-1 --> break 
c    ( b^{38, 25}_2 ∧  b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨  b^{38, 25}_0 ∨  p_950 ∨ break
c  in DIMACS:
-15941 -15942  15943  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 25}_2 ∧ -b^{38, 25}_1 ∧ -b^{38, 25}_0 ∧ true) 
c  in CNF:
c    -b^{38, 25}_2 ∨  b^{38, 25}_1 ∨  b^{38, 25}_0 ∨ false 
c  in DIMACS:
-15941  15942  15943  0

c  3 does not represent an automaton state.
c    -(-b^{38, 25}_2 ∧  b^{38, 25}_1 ∧  b^{38, 25}_0 ∧ true) 
c  in CNF:
c     b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ false 
c  in DIMACS:
 15941 -15942 -15943  0
c  -3 does not represent an automaton state.
c    -( b^{38, 25}_2 ∧  b^{38, 25}_1 ∧  b^{38, 25}_0 ∧ true) 
c  in CNF:
c    -b^{38, 25}_2 ∨ -b^{38, 25}_1 ∨ -b^{38, 25}_0 ∨ false 
c  in DIMACS:
-15941 -15942 -15943  0

c i = 26
c  -2+1 --> -1
c    ( b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧  p_988) -> ( b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0)
c  in CNF:
c    -b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨  b^{38, 27}_2
c    -b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_1
c    -b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨  b^{38, 27}_0
c  in DIMACS:
-15944 -15945  15946 -988  15947 0
-15944 -15945  15946 -988 -15948 0
-15944 -15945  15946 -988  15949 0

c  -1+1 --> 0
c    ( b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0 ∧  p_988) -> (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧ -b^{38, 27}_0)
c  in CNF:
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_2
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_1
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_0
c  in DIMACS:
-15944  15945 -15946 -988 -15947 0
-15944  15945 -15946 -988 -15948 0
-15944  15945 -15946 -988 -15949 0

c  0+1 --> 1
c    (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧  p_988) -> (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0)
c  in CNF:
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_2
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_1
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨  b^{38, 27}_0
c  in DIMACS:
 15944  15945  15946 -988 -15947 0
 15944  15945  15946 -988 -15948 0
 15944  15945  15946 -988  15949 0

c  1+1 --> 2
c    (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0 ∧  p_988) -> (-b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0)
c  in CNF:
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_2
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨  b^{38, 27}_1
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ -p_988 ∨ -b^{38, 27}_0
c  in DIMACS:
 15944  15945 -15946 -988 -15947 0
 15944  15945 -15946 -988  15948 0
 15944  15945 -15946 -988 -15949 0

c  2+1 --> break 
c    (-b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧  p_988) -> break
c  in CNF:
c     b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 15944 -15945  15946 -988 1162 0


c  2-1 --> 1
c    (-b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧ -p_988) -> (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0)
c  in CNF:
c     b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_2
c     b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_1
c     b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨  b^{38, 27}_0
c  in DIMACS:
 15944 -15945  15946  988 -15947 0
 15944 -15945  15946  988 -15948 0
 15944 -15945  15946  988  15949 0

c  1-1 --> 0
c    (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0 ∧ -p_988) -> (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧ -b^{38, 27}_0)
c  in CNF:
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_2
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_1
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_0
c  in DIMACS:
 15944  15945 -15946  988 -15947 0
 15944  15945 -15946  988 -15948 0
 15944  15945 -15946  988 -15949 0

c  0-1 --> -1
c    (-b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧ -p_988) -> ( b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0)
c  in CNF:
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨  b^{38, 27}_2
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_1
c     b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨  b^{38, 27}_0
c  in DIMACS:
 15944  15945  15946  988  15947 0
 15944  15945  15946  988 -15948 0
 15944  15945  15946  988  15949 0

c  -1-1 --> -2
c    ( b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧  b^{38, 26}_0 ∧ -p_988) -> ( b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0)
c  in CNF:
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨  b^{38, 27}_2
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨  b^{38, 27}_1
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨  p_988 ∨ -b^{38, 27}_0
c  in DIMACS:
-15944  15945 -15946  988  15947 0
-15944  15945 -15946  988  15948 0
-15944  15945 -15946  988 -15949 0

c  -2-1 --> break 
c    ( b^{38, 26}_2 ∧  b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨  b^{38, 26}_0 ∨  p_988 ∨ break
c  in DIMACS:
-15944 -15945  15946  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 26}_2 ∧ -b^{38, 26}_1 ∧ -b^{38, 26}_0 ∧ true) 
c  in CNF:
c    -b^{38, 26}_2 ∨  b^{38, 26}_1 ∨  b^{38, 26}_0 ∨ false 
c  in DIMACS:
-15944  15945  15946  0

c  3 does not represent an automaton state.
c    -(-b^{38, 26}_2 ∧  b^{38, 26}_1 ∧  b^{38, 26}_0 ∧ true) 
c  in CNF:
c     b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ false 
c  in DIMACS:
 15944 -15945 -15946  0
c  -3 does not represent an automaton state.
c    -( b^{38, 26}_2 ∧  b^{38, 26}_1 ∧  b^{38, 26}_0 ∧ true) 
c  in CNF:
c    -b^{38, 26}_2 ∨ -b^{38, 26}_1 ∨ -b^{38, 26}_0 ∨ false 
c  in DIMACS:
-15944 -15945 -15946  0

c i = 27
c  -2+1 --> -1
c    ( b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧  p_1026) -> ( b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0)
c  in CNF:
c    -b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨  b^{38, 28}_2
c    -b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_1
c    -b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨  b^{38, 28}_0
c  in DIMACS:
-15947 -15948  15949 -1026  15950 0
-15947 -15948  15949 -1026 -15951 0
-15947 -15948  15949 -1026  15952 0

c  -1+1 --> 0
c    ( b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0 ∧  p_1026) -> (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧ -b^{38, 28}_0)
c  in CNF:
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_2
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_1
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_0
c  in DIMACS:
-15947  15948 -15949 -1026 -15950 0
-15947  15948 -15949 -1026 -15951 0
-15947  15948 -15949 -1026 -15952 0

c  0+1 --> 1
c    (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧  p_1026) -> (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0)
c  in CNF:
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_2
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_1
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨  b^{38, 28}_0
c  in DIMACS:
 15947  15948  15949 -1026 -15950 0
 15947  15948  15949 -1026 -15951 0
 15947  15948  15949 -1026  15952 0

c  1+1 --> 2
c    (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0 ∧  p_1026) -> (-b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0)
c  in CNF:
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_2
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨  b^{38, 28}_1
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ -p_1026 ∨ -b^{38, 28}_0
c  in DIMACS:
 15947  15948 -15949 -1026 -15950 0
 15947  15948 -15949 -1026  15951 0
 15947  15948 -15949 -1026 -15952 0

c  2+1 --> break 
c    (-b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 15947 -15948  15949 -1026 1162 0


c  2-1 --> 1
c    (-b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧ -p_1026) -> (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0)
c  in CNF:
c     b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_2
c     b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_1
c     b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨  b^{38, 28}_0
c  in DIMACS:
 15947 -15948  15949  1026 -15950 0
 15947 -15948  15949  1026 -15951 0
 15947 -15948  15949  1026  15952 0

c  1-1 --> 0
c    (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0 ∧ -p_1026) -> (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧ -b^{38, 28}_0)
c  in CNF:
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_2
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_1
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_0
c  in DIMACS:
 15947  15948 -15949  1026 -15950 0
 15947  15948 -15949  1026 -15951 0
 15947  15948 -15949  1026 -15952 0

c  0-1 --> -1
c    (-b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧ -p_1026) -> ( b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0)
c  in CNF:
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨  b^{38, 28}_2
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_1
c     b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨  b^{38, 28}_0
c  in DIMACS:
 15947  15948  15949  1026  15950 0
 15947  15948  15949  1026 -15951 0
 15947  15948  15949  1026  15952 0

c  -1-1 --> -2
c    ( b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧  b^{38, 27}_0 ∧ -p_1026) -> ( b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0)
c  in CNF:
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨  b^{38, 28}_2
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨  b^{38, 28}_1
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨  p_1026 ∨ -b^{38, 28}_0
c  in DIMACS:
-15947  15948 -15949  1026  15950 0
-15947  15948 -15949  1026  15951 0
-15947  15948 -15949  1026 -15952 0

c  -2-1 --> break 
c    ( b^{38, 27}_2 ∧  b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨  b^{38, 27}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-15947 -15948  15949  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 27}_2 ∧ -b^{38, 27}_1 ∧ -b^{38, 27}_0 ∧ true) 
c  in CNF:
c    -b^{38, 27}_2 ∨  b^{38, 27}_1 ∨  b^{38, 27}_0 ∨ false 
c  in DIMACS:
-15947  15948  15949  0

c  3 does not represent an automaton state.
c    -(-b^{38, 27}_2 ∧  b^{38, 27}_1 ∧  b^{38, 27}_0 ∧ true) 
c  in CNF:
c     b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ false 
c  in DIMACS:
 15947 -15948 -15949  0
c  -3 does not represent an automaton state.
c    -( b^{38, 27}_2 ∧  b^{38, 27}_1 ∧  b^{38, 27}_0 ∧ true) 
c  in CNF:
c    -b^{38, 27}_2 ∨ -b^{38, 27}_1 ∨ -b^{38, 27}_0 ∨ false 
c  in DIMACS:
-15947 -15948 -15949  0

c i = 28
c  -2+1 --> -1
c    ( b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧  p_1064) -> ( b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0)
c  in CNF:
c    -b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨  b^{38, 29}_2
c    -b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_1
c    -b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨  b^{38, 29}_0
c  in DIMACS:
-15950 -15951  15952 -1064  15953 0
-15950 -15951  15952 -1064 -15954 0
-15950 -15951  15952 -1064  15955 0

c  -1+1 --> 0
c    ( b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0 ∧  p_1064) -> (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧ -b^{38, 29}_0)
c  in CNF:
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_2
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_1
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_0
c  in DIMACS:
-15950  15951 -15952 -1064 -15953 0
-15950  15951 -15952 -1064 -15954 0
-15950  15951 -15952 -1064 -15955 0

c  0+1 --> 1
c    (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧  p_1064) -> (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0)
c  in CNF:
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_2
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_1
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨  b^{38, 29}_0
c  in DIMACS:
 15950  15951  15952 -1064 -15953 0
 15950  15951  15952 -1064 -15954 0
 15950  15951  15952 -1064  15955 0

c  1+1 --> 2
c    (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0 ∧  p_1064) -> (-b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0)
c  in CNF:
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_2
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨  b^{38, 29}_1
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ -p_1064 ∨ -b^{38, 29}_0
c  in DIMACS:
 15950  15951 -15952 -1064 -15953 0
 15950  15951 -15952 -1064  15954 0
 15950  15951 -15952 -1064 -15955 0

c  2+1 --> break 
c    (-b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 15950 -15951  15952 -1064 1162 0


c  2-1 --> 1
c    (-b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧ -p_1064) -> (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0)
c  in CNF:
c     b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_2
c     b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_1
c     b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨  b^{38, 29}_0
c  in DIMACS:
 15950 -15951  15952  1064 -15953 0
 15950 -15951  15952  1064 -15954 0
 15950 -15951  15952  1064  15955 0

c  1-1 --> 0
c    (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0 ∧ -p_1064) -> (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧ -b^{38, 29}_0)
c  in CNF:
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_2
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_1
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_0
c  in DIMACS:
 15950  15951 -15952  1064 -15953 0
 15950  15951 -15952  1064 -15954 0
 15950  15951 -15952  1064 -15955 0

c  0-1 --> -1
c    (-b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧ -p_1064) -> ( b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0)
c  in CNF:
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨  b^{38, 29}_2
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_1
c     b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨  b^{38, 29}_0
c  in DIMACS:
 15950  15951  15952  1064  15953 0
 15950  15951  15952  1064 -15954 0
 15950  15951  15952  1064  15955 0

c  -1-1 --> -2
c    ( b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧  b^{38, 28}_0 ∧ -p_1064) -> ( b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0)
c  in CNF:
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨  b^{38, 29}_2
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨  b^{38, 29}_1
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨  p_1064 ∨ -b^{38, 29}_0
c  in DIMACS:
-15950  15951 -15952  1064  15953 0
-15950  15951 -15952  1064  15954 0
-15950  15951 -15952  1064 -15955 0

c  -2-1 --> break 
c    ( b^{38, 28}_2 ∧  b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨  b^{38, 28}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-15950 -15951  15952  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 28}_2 ∧ -b^{38, 28}_1 ∧ -b^{38, 28}_0 ∧ true) 
c  in CNF:
c    -b^{38, 28}_2 ∨  b^{38, 28}_1 ∨  b^{38, 28}_0 ∨ false 
c  in DIMACS:
-15950  15951  15952  0

c  3 does not represent an automaton state.
c    -(-b^{38, 28}_2 ∧  b^{38, 28}_1 ∧  b^{38, 28}_0 ∧ true) 
c  in CNF:
c     b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ false 
c  in DIMACS:
 15950 -15951 -15952  0
c  -3 does not represent an automaton state.
c    -( b^{38, 28}_2 ∧  b^{38, 28}_1 ∧  b^{38, 28}_0 ∧ true) 
c  in CNF:
c    -b^{38, 28}_2 ∨ -b^{38, 28}_1 ∨ -b^{38, 28}_0 ∨ false 
c  in DIMACS:
-15950 -15951 -15952  0

c i = 29
c  -2+1 --> -1
c    ( b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧  p_1102) -> ( b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0)
c  in CNF:
c    -b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨  b^{38, 30}_2
c    -b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_1
c    -b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨  b^{38, 30}_0
c  in DIMACS:
-15953 -15954  15955 -1102  15956 0
-15953 -15954  15955 -1102 -15957 0
-15953 -15954  15955 -1102  15958 0

c  -1+1 --> 0
c    ( b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0 ∧  p_1102) -> (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧ -b^{38, 30}_0)
c  in CNF:
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_2
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_1
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_0
c  in DIMACS:
-15953  15954 -15955 -1102 -15956 0
-15953  15954 -15955 -1102 -15957 0
-15953  15954 -15955 -1102 -15958 0

c  0+1 --> 1
c    (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧  p_1102) -> (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0)
c  in CNF:
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_2
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_1
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨  b^{38, 30}_0
c  in DIMACS:
 15953  15954  15955 -1102 -15956 0
 15953  15954  15955 -1102 -15957 0
 15953  15954  15955 -1102  15958 0

c  1+1 --> 2
c    (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0 ∧  p_1102) -> (-b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0)
c  in CNF:
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_2
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨  b^{38, 30}_1
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ -p_1102 ∨ -b^{38, 30}_0
c  in DIMACS:
 15953  15954 -15955 -1102 -15956 0
 15953  15954 -15955 -1102  15957 0
 15953  15954 -15955 -1102 -15958 0

c  2+1 --> break 
c    (-b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 15953 -15954  15955 -1102 1162 0


c  2-1 --> 1
c    (-b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧ -p_1102) -> (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0)
c  in CNF:
c     b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_2
c     b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_1
c     b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨  b^{38, 30}_0
c  in DIMACS:
 15953 -15954  15955  1102 -15956 0
 15953 -15954  15955  1102 -15957 0
 15953 -15954  15955  1102  15958 0

c  1-1 --> 0
c    (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0 ∧ -p_1102) -> (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧ -b^{38, 30}_0)
c  in CNF:
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_2
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_1
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_0
c  in DIMACS:
 15953  15954 -15955  1102 -15956 0
 15953  15954 -15955  1102 -15957 0
 15953  15954 -15955  1102 -15958 0

c  0-1 --> -1
c    (-b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧ -p_1102) -> ( b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0)
c  in CNF:
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨  b^{38, 30}_2
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_1
c     b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨  b^{38, 30}_0
c  in DIMACS:
 15953  15954  15955  1102  15956 0
 15953  15954  15955  1102 -15957 0
 15953  15954  15955  1102  15958 0

c  -1-1 --> -2
c    ( b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧  b^{38, 29}_0 ∧ -p_1102) -> ( b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0)
c  in CNF:
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨  b^{38, 30}_2
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨  b^{38, 30}_1
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨  p_1102 ∨ -b^{38, 30}_0
c  in DIMACS:
-15953  15954 -15955  1102  15956 0
-15953  15954 -15955  1102  15957 0
-15953  15954 -15955  1102 -15958 0

c  -2-1 --> break 
c    ( b^{38, 29}_2 ∧  b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨  b^{38, 29}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-15953 -15954  15955  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 29}_2 ∧ -b^{38, 29}_1 ∧ -b^{38, 29}_0 ∧ true) 
c  in CNF:
c    -b^{38, 29}_2 ∨  b^{38, 29}_1 ∨  b^{38, 29}_0 ∨ false 
c  in DIMACS:
-15953  15954  15955  0

c  3 does not represent an automaton state.
c    -(-b^{38, 29}_2 ∧  b^{38, 29}_1 ∧  b^{38, 29}_0 ∧ true) 
c  in CNF:
c     b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ false 
c  in DIMACS:
 15953 -15954 -15955  0
c  -3 does not represent an automaton state.
c    -( b^{38, 29}_2 ∧  b^{38, 29}_1 ∧  b^{38, 29}_0 ∧ true) 
c  in CNF:
c    -b^{38, 29}_2 ∨ -b^{38, 29}_1 ∨ -b^{38, 29}_0 ∨ false 
c  in DIMACS:
-15953 -15954 -15955  0

c i = 30
c  -2+1 --> -1
c    ( b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧  p_1140) -> ( b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧  b^{38, 31}_0)
c  in CNF:
c    -b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨  b^{38, 31}_2
c    -b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_1
c    -b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨  b^{38, 31}_0
c  in DIMACS:
-15956 -15957  15958 -1140  15959 0
-15956 -15957  15958 -1140 -15960 0
-15956 -15957  15958 -1140  15961 0

c  -1+1 --> 0
c    ( b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0 ∧  p_1140) -> (-b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧ -b^{38, 31}_0)
c  in CNF:
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_2
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_1
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_0
c  in DIMACS:
-15956  15957 -15958 -1140 -15959 0
-15956  15957 -15958 -1140 -15960 0
-15956  15957 -15958 -1140 -15961 0

c  0+1 --> 1
c    (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧  p_1140) -> (-b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧  b^{38, 31}_0)
c  in CNF:
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_2
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_1
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨  b^{38, 31}_0
c  in DIMACS:
 15956  15957  15958 -1140 -15959 0
 15956  15957  15958 -1140 -15960 0
 15956  15957  15958 -1140  15961 0

c  1+1 --> 2
c    (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0 ∧  p_1140) -> (-b^{38, 31}_2 ∧  b^{38, 31}_1 ∧ -b^{38, 31}_0)
c  in CNF:
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_2
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨  b^{38, 31}_1
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ -p_1140 ∨ -b^{38, 31}_0
c  in DIMACS:
 15956  15957 -15958 -1140 -15959 0
 15956  15957 -15958 -1140  15960 0
 15956  15957 -15958 -1140 -15961 0

c  2+1 --> break 
c    (-b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 15956 -15957  15958 -1140 1162 0


c  2-1 --> 1
c    (-b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧ -p_1140) -> (-b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧  b^{38, 31}_0)
c  in CNF:
c     b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_2
c     b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_1
c     b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨  b^{38, 31}_0
c  in DIMACS:
 15956 -15957  15958  1140 -15959 0
 15956 -15957  15958  1140 -15960 0
 15956 -15957  15958  1140  15961 0

c  1-1 --> 0
c    (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0 ∧ -p_1140) -> (-b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧ -b^{38, 31}_0)
c  in CNF:
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_2
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_1
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_0
c  in DIMACS:
 15956  15957 -15958  1140 -15959 0
 15956  15957 -15958  1140 -15960 0
 15956  15957 -15958  1140 -15961 0

c  0-1 --> -1
c    (-b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧ -p_1140) -> ( b^{38, 31}_2 ∧ -b^{38, 31}_1 ∧  b^{38, 31}_0)
c  in CNF:
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨  b^{38, 31}_2
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_1
c     b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨  b^{38, 31}_0
c  in DIMACS:
 15956  15957  15958  1140  15959 0
 15956  15957  15958  1140 -15960 0
 15956  15957  15958  1140  15961 0

c  -1-1 --> -2
c    ( b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧  b^{38, 30}_0 ∧ -p_1140) -> ( b^{38, 31}_2 ∧  b^{38, 31}_1 ∧ -b^{38, 31}_0)
c  in CNF:
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨  b^{38, 31}_2
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨  b^{38, 31}_1
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨  p_1140 ∨ -b^{38, 31}_0
c  in DIMACS:
-15956  15957 -15958  1140  15959 0
-15956  15957 -15958  1140  15960 0
-15956  15957 -15958  1140 -15961 0

c  -2-1 --> break 
c    ( b^{38, 30}_2 ∧  b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨  b^{38, 30}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-15956 -15957  15958  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{38, 30}_2 ∧ -b^{38, 30}_1 ∧ -b^{38, 30}_0 ∧ true) 
c  in CNF:
c    -b^{38, 30}_2 ∨  b^{38, 30}_1 ∨  b^{38, 30}_0 ∨ false 
c  in DIMACS:
-15956  15957  15958  0

c  3 does not represent an automaton state.
c    -(-b^{38, 30}_2 ∧  b^{38, 30}_1 ∧  b^{38, 30}_0 ∧ true) 
c  in CNF:
c     b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ false 
c  in DIMACS:
 15956 -15957 -15958  0
c  -3 does not represent an automaton state.
c    -( b^{38, 30}_2 ∧  b^{38, 30}_1 ∧  b^{38, 30}_0 ∧ true) 
c  in CNF:
c    -b^{38, 30}_2 ∨ -b^{38, 30}_1 ∨ -b^{38, 30}_0 ∨ false 
c  in DIMACS:
-15956 -15957 -15958  0

c INIT for k = 39
c    -b^{39, 1}_2
c    -b^{39, 1}_1
c    -b^{39, 1}_0
c  in DIMACS:
-15962 0
-15963 0
-15964 0

c Transitions for k = 39
c i = 1
c  -2+1 --> -1
c    ( b^{39, 1}_2 ∧  b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧  p_39) -> ( b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0)
c  in CNF:
c    -b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨  b^{39, 2}_2
c    -b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_1
c    -b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨  b^{39, 2}_0
c  in DIMACS:
-15962 -15963  15964 -39  15965 0
-15962 -15963  15964 -39 -15966 0
-15962 -15963  15964 -39  15967 0

c  -1+1 --> 0
c    ( b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧  b^{39, 1}_0 ∧  p_39) -> (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧ -b^{39, 2}_0)
c  in CNF:
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_2
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_1
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_0
c  in DIMACS:
-15962  15963 -15964 -39 -15965 0
-15962  15963 -15964 -39 -15966 0
-15962  15963 -15964 -39 -15967 0

c  0+1 --> 1
c    (-b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧  p_39) -> (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0)
c  in CNF:
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_2
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_1
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨  b^{39, 2}_0
c  in DIMACS:
 15962  15963  15964 -39 -15965 0
 15962  15963  15964 -39 -15966 0
 15962  15963  15964 -39  15967 0

c  1+1 --> 2
c    (-b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧  b^{39, 1}_0 ∧  p_39) -> (-b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0)
c  in CNF:
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_2
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨  b^{39, 2}_1
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ -p_39 ∨ -b^{39, 2}_0
c  in DIMACS:
 15962  15963 -15964 -39 -15965 0
 15962  15963 -15964 -39  15966 0
 15962  15963 -15964 -39 -15967 0

c  2+1 --> break 
c    (-b^{39, 1}_2 ∧  b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧  p_39) -> break
c  in CNF:
c     b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ -p_39 ∨ break
c  in DIMACS:
 15962 -15963  15964 -39 1162 0


c  2-1 --> 1
c    (-b^{39, 1}_2 ∧  b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧ -p_39) -> (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0)
c  in CNF:
c     b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_2
c     b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_1
c     b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨  b^{39, 2}_0
c  in DIMACS:
 15962 -15963  15964  39 -15965 0
 15962 -15963  15964  39 -15966 0
 15962 -15963  15964  39  15967 0

c  1-1 --> 0
c    (-b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧  b^{39, 1}_0 ∧ -p_39) -> (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧ -b^{39, 2}_0)
c  in CNF:
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_2
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_1
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_0
c  in DIMACS:
 15962  15963 -15964  39 -15965 0
 15962  15963 -15964  39 -15966 0
 15962  15963 -15964  39 -15967 0

c  0-1 --> -1
c    (-b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧ -p_39) -> ( b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0)
c  in CNF:
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨  b^{39, 2}_2
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_1
c     b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨  b^{39, 2}_0
c  in DIMACS:
 15962  15963  15964  39  15965 0
 15962  15963  15964  39 -15966 0
 15962  15963  15964  39  15967 0

c  -1-1 --> -2
c    ( b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧  b^{39, 1}_0 ∧ -p_39) -> ( b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0)
c  in CNF:
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨  b^{39, 2}_2
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨  b^{39, 2}_1
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨  p_39 ∨ -b^{39, 2}_0
c  in DIMACS:
-15962  15963 -15964  39  15965 0
-15962  15963 -15964  39  15966 0
-15962  15963 -15964  39 -15967 0

c  -2-1 --> break 
c    ( b^{39, 1}_2 ∧  b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧ -p_39) -> break
c  in CNF:
c    -b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨  b^{39, 1}_0 ∨  p_39 ∨ break
c  in DIMACS:
-15962 -15963  15964  39 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 1}_2 ∧ -b^{39, 1}_1 ∧ -b^{39, 1}_0 ∧ true) 
c  in CNF:
c    -b^{39, 1}_2 ∨  b^{39, 1}_1 ∨  b^{39, 1}_0 ∨ false 
c  in DIMACS:
-15962  15963  15964  0

c  3 does not represent an automaton state.
c    -(-b^{39, 1}_2 ∧  b^{39, 1}_1 ∧  b^{39, 1}_0 ∧ true) 
c  in CNF:
c     b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ false 
c  in DIMACS:
 15962 -15963 -15964  0
c  -3 does not represent an automaton state.
c    -( b^{39, 1}_2 ∧  b^{39, 1}_1 ∧  b^{39, 1}_0 ∧ true) 
c  in CNF:
c    -b^{39, 1}_2 ∨ -b^{39, 1}_1 ∨ -b^{39, 1}_0 ∨ false 
c  in DIMACS:
-15962 -15963 -15964  0

c i = 2
c  -2+1 --> -1
c    ( b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧  p_78) -> ( b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0)
c  in CNF:
c    -b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨  b^{39, 3}_2
c    -b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_1
c    -b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨  b^{39, 3}_0
c  in DIMACS:
-15965 -15966  15967 -78  15968 0
-15965 -15966  15967 -78 -15969 0
-15965 -15966  15967 -78  15970 0

c  -1+1 --> 0
c    ( b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0 ∧  p_78) -> (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧ -b^{39, 3}_0)
c  in CNF:
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_2
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_1
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_0
c  in DIMACS:
-15965  15966 -15967 -78 -15968 0
-15965  15966 -15967 -78 -15969 0
-15965  15966 -15967 -78 -15970 0

c  0+1 --> 1
c    (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧  p_78) -> (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0)
c  in CNF:
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_2
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_1
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨  b^{39, 3}_0
c  in DIMACS:
 15965  15966  15967 -78 -15968 0
 15965  15966  15967 -78 -15969 0
 15965  15966  15967 -78  15970 0

c  1+1 --> 2
c    (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0 ∧  p_78) -> (-b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0)
c  in CNF:
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_2
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨  b^{39, 3}_1
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ -p_78 ∨ -b^{39, 3}_0
c  in DIMACS:
 15965  15966 -15967 -78 -15968 0
 15965  15966 -15967 -78  15969 0
 15965  15966 -15967 -78 -15970 0

c  2+1 --> break 
c    (-b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧  p_78) -> break
c  in CNF:
c     b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 15965 -15966  15967 -78 1162 0


c  2-1 --> 1
c    (-b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧ -p_78) -> (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0)
c  in CNF:
c     b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_2
c     b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_1
c     b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨  b^{39, 3}_0
c  in DIMACS:
 15965 -15966  15967  78 -15968 0
 15965 -15966  15967  78 -15969 0
 15965 -15966  15967  78  15970 0

c  1-1 --> 0
c    (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0 ∧ -p_78) -> (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧ -b^{39, 3}_0)
c  in CNF:
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_2
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_1
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_0
c  in DIMACS:
 15965  15966 -15967  78 -15968 0
 15965  15966 -15967  78 -15969 0
 15965  15966 -15967  78 -15970 0

c  0-1 --> -1
c    (-b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧ -p_78) -> ( b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0)
c  in CNF:
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨  b^{39, 3}_2
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_1
c     b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨  b^{39, 3}_0
c  in DIMACS:
 15965  15966  15967  78  15968 0
 15965  15966  15967  78 -15969 0
 15965  15966  15967  78  15970 0

c  -1-1 --> -2
c    ( b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧  b^{39, 2}_0 ∧ -p_78) -> ( b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0)
c  in CNF:
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨  b^{39, 3}_2
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨  b^{39, 3}_1
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨  p_78 ∨ -b^{39, 3}_0
c  in DIMACS:
-15965  15966 -15967  78  15968 0
-15965  15966 -15967  78  15969 0
-15965  15966 -15967  78 -15970 0

c  -2-1 --> break 
c    ( b^{39, 2}_2 ∧  b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨  b^{39, 2}_0 ∨  p_78 ∨ break
c  in DIMACS:
-15965 -15966  15967  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 2}_2 ∧ -b^{39, 2}_1 ∧ -b^{39, 2}_0 ∧ true) 
c  in CNF:
c    -b^{39, 2}_2 ∨  b^{39, 2}_1 ∨  b^{39, 2}_0 ∨ false 
c  in DIMACS:
-15965  15966  15967  0

c  3 does not represent an automaton state.
c    -(-b^{39, 2}_2 ∧  b^{39, 2}_1 ∧  b^{39, 2}_0 ∧ true) 
c  in CNF:
c     b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ false 
c  in DIMACS:
 15965 -15966 -15967  0
c  -3 does not represent an automaton state.
c    -( b^{39, 2}_2 ∧  b^{39, 2}_1 ∧  b^{39, 2}_0 ∧ true) 
c  in CNF:
c    -b^{39, 2}_2 ∨ -b^{39, 2}_1 ∨ -b^{39, 2}_0 ∨ false 
c  in DIMACS:
-15965 -15966 -15967  0

c i = 3
c  -2+1 --> -1
c    ( b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧  p_117) -> ( b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0)
c  in CNF:
c    -b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨  b^{39, 4}_2
c    -b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_1
c    -b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨  b^{39, 4}_0
c  in DIMACS:
-15968 -15969  15970 -117  15971 0
-15968 -15969  15970 -117 -15972 0
-15968 -15969  15970 -117  15973 0

c  -1+1 --> 0
c    ( b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0 ∧  p_117) -> (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧ -b^{39, 4}_0)
c  in CNF:
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_2
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_1
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_0
c  in DIMACS:
-15968  15969 -15970 -117 -15971 0
-15968  15969 -15970 -117 -15972 0
-15968  15969 -15970 -117 -15973 0

c  0+1 --> 1
c    (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧  p_117) -> (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0)
c  in CNF:
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_2
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_1
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨  b^{39, 4}_0
c  in DIMACS:
 15968  15969  15970 -117 -15971 0
 15968  15969  15970 -117 -15972 0
 15968  15969  15970 -117  15973 0

c  1+1 --> 2
c    (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0 ∧  p_117) -> (-b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0)
c  in CNF:
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_2
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨  b^{39, 4}_1
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ -p_117 ∨ -b^{39, 4}_0
c  in DIMACS:
 15968  15969 -15970 -117 -15971 0
 15968  15969 -15970 -117  15972 0
 15968  15969 -15970 -117 -15973 0

c  2+1 --> break 
c    (-b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧  p_117) -> break
c  in CNF:
c     b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 15968 -15969  15970 -117 1162 0


c  2-1 --> 1
c    (-b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧ -p_117) -> (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0)
c  in CNF:
c     b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_2
c     b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_1
c     b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨  b^{39, 4}_0
c  in DIMACS:
 15968 -15969  15970  117 -15971 0
 15968 -15969  15970  117 -15972 0
 15968 -15969  15970  117  15973 0

c  1-1 --> 0
c    (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0 ∧ -p_117) -> (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧ -b^{39, 4}_0)
c  in CNF:
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_2
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_1
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_0
c  in DIMACS:
 15968  15969 -15970  117 -15971 0
 15968  15969 -15970  117 -15972 0
 15968  15969 -15970  117 -15973 0

c  0-1 --> -1
c    (-b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧ -p_117) -> ( b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0)
c  in CNF:
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨  b^{39, 4}_2
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_1
c     b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨  b^{39, 4}_0
c  in DIMACS:
 15968  15969  15970  117  15971 0
 15968  15969  15970  117 -15972 0
 15968  15969  15970  117  15973 0

c  -1-1 --> -2
c    ( b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧  b^{39, 3}_0 ∧ -p_117) -> ( b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0)
c  in CNF:
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨  b^{39, 4}_2
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨  b^{39, 4}_1
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨  p_117 ∨ -b^{39, 4}_0
c  in DIMACS:
-15968  15969 -15970  117  15971 0
-15968  15969 -15970  117  15972 0
-15968  15969 -15970  117 -15973 0

c  -2-1 --> break 
c    ( b^{39, 3}_2 ∧  b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨  b^{39, 3}_0 ∨  p_117 ∨ break
c  in DIMACS:
-15968 -15969  15970  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 3}_2 ∧ -b^{39, 3}_1 ∧ -b^{39, 3}_0 ∧ true) 
c  in CNF:
c    -b^{39, 3}_2 ∨  b^{39, 3}_1 ∨  b^{39, 3}_0 ∨ false 
c  in DIMACS:
-15968  15969  15970  0

c  3 does not represent an automaton state.
c    -(-b^{39, 3}_2 ∧  b^{39, 3}_1 ∧  b^{39, 3}_0 ∧ true) 
c  in CNF:
c     b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ false 
c  in DIMACS:
 15968 -15969 -15970  0
c  -3 does not represent an automaton state.
c    -( b^{39, 3}_2 ∧  b^{39, 3}_1 ∧  b^{39, 3}_0 ∧ true) 
c  in CNF:
c    -b^{39, 3}_2 ∨ -b^{39, 3}_1 ∨ -b^{39, 3}_0 ∨ false 
c  in DIMACS:
-15968 -15969 -15970  0

c i = 4
c  -2+1 --> -1
c    ( b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧  p_156) -> ( b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0)
c  in CNF:
c    -b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨  b^{39, 5}_2
c    -b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_1
c    -b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨  b^{39, 5}_0
c  in DIMACS:
-15971 -15972  15973 -156  15974 0
-15971 -15972  15973 -156 -15975 0
-15971 -15972  15973 -156  15976 0

c  -1+1 --> 0
c    ( b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0 ∧  p_156) -> (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧ -b^{39, 5}_0)
c  in CNF:
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_2
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_1
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_0
c  in DIMACS:
-15971  15972 -15973 -156 -15974 0
-15971  15972 -15973 -156 -15975 0
-15971  15972 -15973 -156 -15976 0

c  0+1 --> 1
c    (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧  p_156) -> (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0)
c  in CNF:
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_2
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_1
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨  b^{39, 5}_0
c  in DIMACS:
 15971  15972  15973 -156 -15974 0
 15971  15972  15973 -156 -15975 0
 15971  15972  15973 -156  15976 0

c  1+1 --> 2
c    (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0 ∧  p_156) -> (-b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0)
c  in CNF:
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_2
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨  b^{39, 5}_1
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ -p_156 ∨ -b^{39, 5}_0
c  in DIMACS:
 15971  15972 -15973 -156 -15974 0
 15971  15972 -15973 -156  15975 0
 15971  15972 -15973 -156 -15976 0

c  2+1 --> break 
c    (-b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧  p_156) -> break
c  in CNF:
c     b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 15971 -15972  15973 -156 1162 0


c  2-1 --> 1
c    (-b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧ -p_156) -> (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0)
c  in CNF:
c     b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_2
c     b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_1
c     b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨  b^{39, 5}_0
c  in DIMACS:
 15971 -15972  15973  156 -15974 0
 15971 -15972  15973  156 -15975 0
 15971 -15972  15973  156  15976 0

c  1-1 --> 0
c    (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0 ∧ -p_156) -> (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧ -b^{39, 5}_0)
c  in CNF:
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_2
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_1
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_0
c  in DIMACS:
 15971  15972 -15973  156 -15974 0
 15971  15972 -15973  156 -15975 0
 15971  15972 -15973  156 -15976 0

c  0-1 --> -1
c    (-b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧ -p_156) -> ( b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0)
c  in CNF:
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨  b^{39, 5}_2
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_1
c     b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨  b^{39, 5}_0
c  in DIMACS:
 15971  15972  15973  156  15974 0
 15971  15972  15973  156 -15975 0
 15971  15972  15973  156  15976 0

c  -1-1 --> -2
c    ( b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧  b^{39, 4}_0 ∧ -p_156) -> ( b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0)
c  in CNF:
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨  b^{39, 5}_2
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨  b^{39, 5}_1
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨  p_156 ∨ -b^{39, 5}_0
c  in DIMACS:
-15971  15972 -15973  156  15974 0
-15971  15972 -15973  156  15975 0
-15971  15972 -15973  156 -15976 0

c  -2-1 --> break 
c    ( b^{39, 4}_2 ∧  b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨  b^{39, 4}_0 ∨  p_156 ∨ break
c  in DIMACS:
-15971 -15972  15973  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 4}_2 ∧ -b^{39, 4}_1 ∧ -b^{39, 4}_0 ∧ true) 
c  in CNF:
c    -b^{39, 4}_2 ∨  b^{39, 4}_1 ∨  b^{39, 4}_0 ∨ false 
c  in DIMACS:
-15971  15972  15973  0

c  3 does not represent an automaton state.
c    -(-b^{39, 4}_2 ∧  b^{39, 4}_1 ∧  b^{39, 4}_0 ∧ true) 
c  in CNF:
c     b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ false 
c  in DIMACS:
 15971 -15972 -15973  0
c  -3 does not represent an automaton state.
c    -( b^{39, 4}_2 ∧  b^{39, 4}_1 ∧  b^{39, 4}_0 ∧ true) 
c  in CNF:
c    -b^{39, 4}_2 ∨ -b^{39, 4}_1 ∨ -b^{39, 4}_0 ∨ false 
c  in DIMACS:
-15971 -15972 -15973  0

c i = 5
c  -2+1 --> -1
c    ( b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧  p_195) -> ( b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0)
c  in CNF:
c    -b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨  b^{39, 6}_2
c    -b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_1
c    -b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨  b^{39, 6}_0
c  in DIMACS:
-15974 -15975  15976 -195  15977 0
-15974 -15975  15976 -195 -15978 0
-15974 -15975  15976 -195  15979 0

c  -1+1 --> 0
c    ( b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0 ∧  p_195) -> (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧ -b^{39, 6}_0)
c  in CNF:
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_2
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_1
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_0
c  in DIMACS:
-15974  15975 -15976 -195 -15977 0
-15974  15975 -15976 -195 -15978 0
-15974  15975 -15976 -195 -15979 0

c  0+1 --> 1
c    (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧  p_195) -> (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0)
c  in CNF:
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_2
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_1
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨  b^{39, 6}_0
c  in DIMACS:
 15974  15975  15976 -195 -15977 0
 15974  15975  15976 -195 -15978 0
 15974  15975  15976 -195  15979 0

c  1+1 --> 2
c    (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0 ∧  p_195) -> (-b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0)
c  in CNF:
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_2
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨  b^{39, 6}_1
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ -p_195 ∨ -b^{39, 6}_0
c  in DIMACS:
 15974  15975 -15976 -195 -15977 0
 15974  15975 -15976 -195  15978 0
 15974  15975 -15976 -195 -15979 0

c  2+1 --> break 
c    (-b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧  p_195) -> break
c  in CNF:
c     b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 15974 -15975  15976 -195 1162 0


c  2-1 --> 1
c    (-b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧ -p_195) -> (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0)
c  in CNF:
c     b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_2
c     b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_1
c     b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨  b^{39, 6}_0
c  in DIMACS:
 15974 -15975  15976  195 -15977 0
 15974 -15975  15976  195 -15978 0
 15974 -15975  15976  195  15979 0

c  1-1 --> 0
c    (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0 ∧ -p_195) -> (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧ -b^{39, 6}_0)
c  in CNF:
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_2
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_1
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_0
c  in DIMACS:
 15974  15975 -15976  195 -15977 0
 15974  15975 -15976  195 -15978 0
 15974  15975 -15976  195 -15979 0

c  0-1 --> -1
c    (-b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧ -p_195) -> ( b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0)
c  in CNF:
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨  b^{39, 6}_2
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_1
c     b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨  b^{39, 6}_0
c  in DIMACS:
 15974  15975  15976  195  15977 0
 15974  15975  15976  195 -15978 0
 15974  15975  15976  195  15979 0

c  -1-1 --> -2
c    ( b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧  b^{39, 5}_0 ∧ -p_195) -> ( b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0)
c  in CNF:
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨  b^{39, 6}_2
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨  b^{39, 6}_1
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨  p_195 ∨ -b^{39, 6}_0
c  in DIMACS:
-15974  15975 -15976  195  15977 0
-15974  15975 -15976  195  15978 0
-15974  15975 -15976  195 -15979 0

c  -2-1 --> break 
c    ( b^{39, 5}_2 ∧  b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨  b^{39, 5}_0 ∨  p_195 ∨ break
c  in DIMACS:
-15974 -15975  15976  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 5}_2 ∧ -b^{39, 5}_1 ∧ -b^{39, 5}_0 ∧ true) 
c  in CNF:
c    -b^{39, 5}_2 ∨  b^{39, 5}_1 ∨  b^{39, 5}_0 ∨ false 
c  in DIMACS:
-15974  15975  15976  0

c  3 does not represent an automaton state.
c    -(-b^{39, 5}_2 ∧  b^{39, 5}_1 ∧  b^{39, 5}_0 ∧ true) 
c  in CNF:
c     b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ false 
c  in DIMACS:
 15974 -15975 -15976  0
c  -3 does not represent an automaton state.
c    -( b^{39, 5}_2 ∧  b^{39, 5}_1 ∧  b^{39, 5}_0 ∧ true) 
c  in CNF:
c    -b^{39, 5}_2 ∨ -b^{39, 5}_1 ∨ -b^{39, 5}_0 ∨ false 
c  in DIMACS:
-15974 -15975 -15976  0

c i = 6
c  -2+1 --> -1
c    ( b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧  p_234) -> ( b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0)
c  in CNF:
c    -b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨  b^{39, 7}_2
c    -b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_1
c    -b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨  b^{39, 7}_0
c  in DIMACS:
-15977 -15978  15979 -234  15980 0
-15977 -15978  15979 -234 -15981 0
-15977 -15978  15979 -234  15982 0

c  -1+1 --> 0
c    ( b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0 ∧  p_234) -> (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧ -b^{39, 7}_0)
c  in CNF:
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_2
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_1
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_0
c  in DIMACS:
-15977  15978 -15979 -234 -15980 0
-15977  15978 -15979 -234 -15981 0
-15977  15978 -15979 -234 -15982 0

c  0+1 --> 1
c    (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧  p_234) -> (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0)
c  in CNF:
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_2
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_1
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨  b^{39, 7}_0
c  in DIMACS:
 15977  15978  15979 -234 -15980 0
 15977  15978  15979 -234 -15981 0
 15977  15978  15979 -234  15982 0

c  1+1 --> 2
c    (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0 ∧  p_234) -> (-b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0)
c  in CNF:
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_2
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨  b^{39, 7}_1
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ -p_234 ∨ -b^{39, 7}_0
c  in DIMACS:
 15977  15978 -15979 -234 -15980 0
 15977  15978 -15979 -234  15981 0
 15977  15978 -15979 -234 -15982 0

c  2+1 --> break 
c    (-b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧  p_234) -> break
c  in CNF:
c     b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 15977 -15978  15979 -234 1162 0


c  2-1 --> 1
c    (-b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧ -p_234) -> (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0)
c  in CNF:
c     b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_2
c     b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_1
c     b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨  b^{39, 7}_0
c  in DIMACS:
 15977 -15978  15979  234 -15980 0
 15977 -15978  15979  234 -15981 0
 15977 -15978  15979  234  15982 0

c  1-1 --> 0
c    (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0 ∧ -p_234) -> (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧ -b^{39, 7}_0)
c  in CNF:
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_2
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_1
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_0
c  in DIMACS:
 15977  15978 -15979  234 -15980 0
 15977  15978 -15979  234 -15981 0
 15977  15978 -15979  234 -15982 0

c  0-1 --> -1
c    (-b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧ -p_234) -> ( b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0)
c  in CNF:
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨  b^{39, 7}_2
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_1
c     b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨  b^{39, 7}_0
c  in DIMACS:
 15977  15978  15979  234  15980 0
 15977  15978  15979  234 -15981 0
 15977  15978  15979  234  15982 0

c  -1-1 --> -2
c    ( b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧  b^{39, 6}_0 ∧ -p_234) -> ( b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0)
c  in CNF:
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨  b^{39, 7}_2
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨  b^{39, 7}_1
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨  p_234 ∨ -b^{39, 7}_0
c  in DIMACS:
-15977  15978 -15979  234  15980 0
-15977  15978 -15979  234  15981 0
-15977  15978 -15979  234 -15982 0

c  -2-1 --> break 
c    ( b^{39, 6}_2 ∧  b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨  b^{39, 6}_0 ∨  p_234 ∨ break
c  in DIMACS:
-15977 -15978  15979  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 6}_2 ∧ -b^{39, 6}_1 ∧ -b^{39, 6}_0 ∧ true) 
c  in CNF:
c    -b^{39, 6}_2 ∨  b^{39, 6}_1 ∨  b^{39, 6}_0 ∨ false 
c  in DIMACS:
-15977  15978  15979  0

c  3 does not represent an automaton state.
c    -(-b^{39, 6}_2 ∧  b^{39, 6}_1 ∧  b^{39, 6}_0 ∧ true) 
c  in CNF:
c     b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ false 
c  in DIMACS:
 15977 -15978 -15979  0
c  -3 does not represent an automaton state.
c    -( b^{39, 6}_2 ∧  b^{39, 6}_1 ∧  b^{39, 6}_0 ∧ true) 
c  in CNF:
c    -b^{39, 6}_2 ∨ -b^{39, 6}_1 ∨ -b^{39, 6}_0 ∨ false 
c  in DIMACS:
-15977 -15978 -15979  0

c i = 7
c  -2+1 --> -1
c    ( b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧  p_273) -> ( b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0)
c  in CNF:
c    -b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨  b^{39, 8}_2
c    -b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_1
c    -b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨  b^{39, 8}_0
c  in DIMACS:
-15980 -15981  15982 -273  15983 0
-15980 -15981  15982 -273 -15984 0
-15980 -15981  15982 -273  15985 0

c  -1+1 --> 0
c    ( b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0 ∧  p_273) -> (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧ -b^{39, 8}_0)
c  in CNF:
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_2
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_1
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_0
c  in DIMACS:
-15980  15981 -15982 -273 -15983 0
-15980  15981 -15982 -273 -15984 0
-15980  15981 -15982 -273 -15985 0

c  0+1 --> 1
c    (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧  p_273) -> (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0)
c  in CNF:
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_2
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_1
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨  b^{39, 8}_0
c  in DIMACS:
 15980  15981  15982 -273 -15983 0
 15980  15981  15982 -273 -15984 0
 15980  15981  15982 -273  15985 0

c  1+1 --> 2
c    (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0 ∧  p_273) -> (-b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0)
c  in CNF:
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_2
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨  b^{39, 8}_1
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ -p_273 ∨ -b^{39, 8}_0
c  in DIMACS:
 15980  15981 -15982 -273 -15983 0
 15980  15981 -15982 -273  15984 0
 15980  15981 -15982 -273 -15985 0

c  2+1 --> break 
c    (-b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧  p_273) -> break
c  in CNF:
c     b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 15980 -15981  15982 -273 1162 0


c  2-1 --> 1
c    (-b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧ -p_273) -> (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0)
c  in CNF:
c     b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_2
c     b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_1
c     b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨  b^{39, 8}_0
c  in DIMACS:
 15980 -15981  15982  273 -15983 0
 15980 -15981  15982  273 -15984 0
 15980 -15981  15982  273  15985 0

c  1-1 --> 0
c    (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0 ∧ -p_273) -> (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧ -b^{39, 8}_0)
c  in CNF:
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_2
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_1
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_0
c  in DIMACS:
 15980  15981 -15982  273 -15983 0
 15980  15981 -15982  273 -15984 0
 15980  15981 -15982  273 -15985 0

c  0-1 --> -1
c    (-b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧ -p_273) -> ( b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0)
c  in CNF:
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨  b^{39, 8}_2
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_1
c     b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨  b^{39, 8}_0
c  in DIMACS:
 15980  15981  15982  273  15983 0
 15980  15981  15982  273 -15984 0
 15980  15981  15982  273  15985 0

c  -1-1 --> -2
c    ( b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧  b^{39, 7}_0 ∧ -p_273) -> ( b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0)
c  in CNF:
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨  b^{39, 8}_2
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨  b^{39, 8}_1
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨  p_273 ∨ -b^{39, 8}_0
c  in DIMACS:
-15980  15981 -15982  273  15983 0
-15980  15981 -15982  273  15984 0
-15980  15981 -15982  273 -15985 0

c  -2-1 --> break 
c    ( b^{39, 7}_2 ∧  b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨  b^{39, 7}_0 ∨  p_273 ∨ break
c  in DIMACS:
-15980 -15981  15982  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 7}_2 ∧ -b^{39, 7}_1 ∧ -b^{39, 7}_0 ∧ true) 
c  in CNF:
c    -b^{39, 7}_2 ∨  b^{39, 7}_1 ∨  b^{39, 7}_0 ∨ false 
c  in DIMACS:
-15980  15981  15982  0

c  3 does not represent an automaton state.
c    -(-b^{39, 7}_2 ∧  b^{39, 7}_1 ∧  b^{39, 7}_0 ∧ true) 
c  in CNF:
c     b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ false 
c  in DIMACS:
 15980 -15981 -15982  0
c  -3 does not represent an automaton state.
c    -( b^{39, 7}_2 ∧  b^{39, 7}_1 ∧  b^{39, 7}_0 ∧ true) 
c  in CNF:
c    -b^{39, 7}_2 ∨ -b^{39, 7}_1 ∨ -b^{39, 7}_0 ∨ false 
c  in DIMACS:
-15980 -15981 -15982  0

c i = 8
c  -2+1 --> -1
c    ( b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧  p_312) -> ( b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0)
c  in CNF:
c    -b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨  b^{39, 9}_2
c    -b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_1
c    -b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨  b^{39, 9}_0
c  in DIMACS:
-15983 -15984  15985 -312  15986 0
-15983 -15984  15985 -312 -15987 0
-15983 -15984  15985 -312  15988 0

c  -1+1 --> 0
c    ( b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0 ∧  p_312) -> (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧ -b^{39, 9}_0)
c  in CNF:
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_2
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_1
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_0
c  in DIMACS:
-15983  15984 -15985 -312 -15986 0
-15983  15984 -15985 -312 -15987 0
-15983  15984 -15985 -312 -15988 0

c  0+1 --> 1
c    (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧  p_312) -> (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0)
c  in CNF:
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_2
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_1
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨  b^{39, 9}_0
c  in DIMACS:
 15983  15984  15985 -312 -15986 0
 15983  15984  15985 -312 -15987 0
 15983  15984  15985 -312  15988 0

c  1+1 --> 2
c    (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0 ∧  p_312) -> (-b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0)
c  in CNF:
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_2
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨  b^{39, 9}_1
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ -p_312 ∨ -b^{39, 9}_0
c  in DIMACS:
 15983  15984 -15985 -312 -15986 0
 15983  15984 -15985 -312  15987 0
 15983  15984 -15985 -312 -15988 0

c  2+1 --> break 
c    (-b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧  p_312) -> break
c  in CNF:
c     b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 15983 -15984  15985 -312 1162 0


c  2-1 --> 1
c    (-b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧ -p_312) -> (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0)
c  in CNF:
c     b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_2
c     b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_1
c     b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨  b^{39, 9}_0
c  in DIMACS:
 15983 -15984  15985  312 -15986 0
 15983 -15984  15985  312 -15987 0
 15983 -15984  15985  312  15988 0

c  1-1 --> 0
c    (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0 ∧ -p_312) -> (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧ -b^{39, 9}_0)
c  in CNF:
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_2
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_1
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_0
c  in DIMACS:
 15983  15984 -15985  312 -15986 0
 15983  15984 -15985  312 -15987 0
 15983  15984 -15985  312 -15988 0

c  0-1 --> -1
c    (-b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧ -p_312) -> ( b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0)
c  in CNF:
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨  b^{39, 9}_2
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_1
c     b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨  b^{39, 9}_0
c  in DIMACS:
 15983  15984  15985  312  15986 0
 15983  15984  15985  312 -15987 0
 15983  15984  15985  312  15988 0

c  -1-1 --> -2
c    ( b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧  b^{39, 8}_0 ∧ -p_312) -> ( b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0)
c  in CNF:
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨  b^{39, 9}_2
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨  b^{39, 9}_1
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨  p_312 ∨ -b^{39, 9}_0
c  in DIMACS:
-15983  15984 -15985  312  15986 0
-15983  15984 -15985  312  15987 0
-15983  15984 -15985  312 -15988 0

c  -2-1 --> break 
c    ( b^{39, 8}_2 ∧  b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨  b^{39, 8}_0 ∨  p_312 ∨ break
c  in DIMACS:
-15983 -15984  15985  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 8}_2 ∧ -b^{39, 8}_1 ∧ -b^{39, 8}_0 ∧ true) 
c  in CNF:
c    -b^{39, 8}_2 ∨  b^{39, 8}_1 ∨  b^{39, 8}_0 ∨ false 
c  in DIMACS:
-15983  15984  15985  0

c  3 does not represent an automaton state.
c    -(-b^{39, 8}_2 ∧  b^{39, 8}_1 ∧  b^{39, 8}_0 ∧ true) 
c  in CNF:
c     b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ false 
c  in DIMACS:
 15983 -15984 -15985  0
c  -3 does not represent an automaton state.
c    -( b^{39, 8}_2 ∧  b^{39, 8}_1 ∧  b^{39, 8}_0 ∧ true) 
c  in CNF:
c    -b^{39, 8}_2 ∨ -b^{39, 8}_1 ∨ -b^{39, 8}_0 ∨ false 
c  in DIMACS:
-15983 -15984 -15985  0

c i = 9
c  -2+1 --> -1
c    ( b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧  p_351) -> ( b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0)
c  in CNF:
c    -b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨  b^{39, 10}_2
c    -b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_1
c    -b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨  b^{39, 10}_0
c  in DIMACS:
-15986 -15987  15988 -351  15989 0
-15986 -15987  15988 -351 -15990 0
-15986 -15987  15988 -351  15991 0

c  -1+1 --> 0
c    ( b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0 ∧  p_351) -> (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧ -b^{39, 10}_0)
c  in CNF:
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_2
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_1
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_0
c  in DIMACS:
-15986  15987 -15988 -351 -15989 0
-15986  15987 -15988 -351 -15990 0
-15986  15987 -15988 -351 -15991 0

c  0+1 --> 1
c    (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧  p_351) -> (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0)
c  in CNF:
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_2
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_1
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨  b^{39, 10}_0
c  in DIMACS:
 15986  15987  15988 -351 -15989 0
 15986  15987  15988 -351 -15990 0
 15986  15987  15988 -351  15991 0

c  1+1 --> 2
c    (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0 ∧  p_351) -> (-b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0)
c  in CNF:
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_2
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨  b^{39, 10}_1
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ -p_351 ∨ -b^{39, 10}_0
c  in DIMACS:
 15986  15987 -15988 -351 -15989 0
 15986  15987 -15988 -351  15990 0
 15986  15987 -15988 -351 -15991 0

c  2+1 --> break 
c    (-b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧  p_351) -> break
c  in CNF:
c     b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 15986 -15987  15988 -351 1162 0


c  2-1 --> 1
c    (-b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧ -p_351) -> (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0)
c  in CNF:
c     b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_2
c     b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_1
c     b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨  b^{39, 10}_0
c  in DIMACS:
 15986 -15987  15988  351 -15989 0
 15986 -15987  15988  351 -15990 0
 15986 -15987  15988  351  15991 0

c  1-1 --> 0
c    (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0 ∧ -p_351) -> (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧ -b^{39, 10}_0)
c  in CNF:
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_2
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_1
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_0
c  in DIMACS:
 15986  15987 -15988  351 -15989 0
 15986  15987 -15988  351 -15990 0
 15986  15987 -15988  351 -15991 0

c  0-1 --> -1
c    (-b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧ -p_351) -> ( b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0)
c  in CNF:
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨  b^{39, 10}_2
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_1
c     b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨  b^{39, 10}_0
c  in DIMACS:
 15986  15987  15988  351  15989 0
 15986  15987  15988  351 -15990 0
 15986  15987  15988  351  15991 0

c  -1-1 --> -2
c    ( b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧  b^{39, 9}_0 ∧ -p_351) -> ( b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0)
c  in CNF:
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨  b^{39, 10}_2
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨  b^{39, 10}_1
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨  p_351 ∨ -b^{39, 10}_0
c  in DIMACS:
-15986  15987 -15988  351  15989 0
-15986  15987 -15988  351  15990 0
-15986  15987 -15988  351 -15991 0

c  -2-1 --> break 
c    ( b^{39, 9}_2 ∧  b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨  b^{39, 9}_0 ∨  p_351 ∨ break
c  in DIMACS:
-15986 -15987  15988  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 9}_2 ∧ -b^{39, 9}_1 ∧ -b^{39, 9}_0 ∧ true) 
c  in CNF:
c    -b^{39, 9}_2 ∨  b^{39, 9}_1 ∨  b^{39, 9}_0 ∨ false 
c  in DIMACS:
-15986  15987  15988  0

c  3 does not represent an automaton state.
c    -(-b^{39, 9}_2 ∧  b^{39, 9}_1 ∧  b^{39, 9}_0 ∧ true) 
c  in CNF:
c     b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ false 
c  in DIMACS:
 15986 -15987 -15988  0
c  -3 does not represent an automaton state.
c    -( b^{39, 9}_2 ∧  b^{39, 9}_1 ∧  b^{39, 9}_0 ∧ true) 
c  in CNF:
c    -b^{39, 9}_2 ∨ -b^{39, 9}_1 ∨ -b^{39, 9}_0 ∨ false 
c  in DIMACS:
-15986 -15987 -15988  0

c i = 10
c  -2+1 --> -1
c    ( b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧  p_390) -> ( b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0)
c  in CNF:
c    -b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨  b^{39, 11}_2
c    -b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_1
c    -b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨  b^{39, 11}_0
c  in DIMACS:
-15989 -15990  15991 -390  15992 0
-15989 -15990  15991 -390 -15993 0
-15989 -15990  15991 -390  15994 0

c  -1+1 --> 0
c    ( b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0 ∧  p_390) -> (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧ -b^{39, 11}_0)
c  in CNF:
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_2
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_1
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_0
c  in DIMACS:
-15989  15990 -15991 -390 -15992 0
-15989  15990 -15991 -390 -15993 0
-15989  15990 -15991 -390 -15994 0

c  0+1 --> 1
c    (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧  p_390) -> (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0)
c  in CNF:
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_2
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_1
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨  b^{39, 11}_0
c  in DIMACS:
 15989  15990  15991 -390 -15992 0
 15989  15990  15991 -390 -15993 0
 15989  15990  15991 -390  15994 0

c  1+1 --> 2
c    (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0 ∧  p_390) -> (-b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0)
c  in CNF:
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_2
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨  b^{39, 11}_1
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ -p_390 ∨ -b^{39, 11}_0
c  in DIMACS:
 15989  15990 -15991 -390 -15992 0
 15989  15990 -15991 -390  15993 0
 15989  15990 -15991 -390 -15994 0

c  2+1 --> break 
c    (-b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧  p_390) -> break
c  in CNF:
c     b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 15989 -15990  15991 -390 1162 0


c  2-1 --> 1
c    (-b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧ -p_390) -> (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0)
c  in CNF:
c     b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_2
c     b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_1
c     b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨  b^{39, 11}_0
c  in DIMACS:
 15989 -15990  15991  390 -15992 0
 15989 -15990  15991  390 -15993 0
 15989 -15990  15991  390  15994 0

c  1-1 --> 0
c    (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0 ∧ -p_390) -> (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧ -b^{39, 11}_0)
c  in CNF:
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_2
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_1
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_0
c  in DIMACS:
 15989  15990 -15991  390 -15992 0
 15989  15990 -15991  390 -15993 0
 15989  15990 -15991  390 -15994 0

c  0-1 --> -1
c    (-b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧ -p_390) -> ( b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0)
c  in CNF:
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨  b^{39, 11}_2
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_1
c     b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨  b^{39, 11}_0
c  in DIMACS:
 15989  15990  15991  390  15992 0
 15989  15990  15991  390 -15993 0
 15989  15990  15991  390  15994 0

c  -1-1 --> -2
c    ( b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧  b^{39, 10}_0 ∧ -p_390) -> ( b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0)
c  in CNF:
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨  b^{39, 11}_2
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨  b^{39, 11}_1
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨  p_390 ∨ -b^{39, 11}_0
c  in DIMACS:
-15989  15990 -15991  390  15992 0
-15989  15990 -15991  390  15993 0
-15989  15990 -15991  390 -15994 0

c  -2-1 --> break 
c    ( b^{39, 10}_2 ∧  b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨  b^{39, 10}_0 ∨  p_390 ∨ break
c  in DIMACS:
-15989 -15990  15991  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 10}_2 ∧ -b^{39, 10}_1 ∧ -b^{39, 10}_0 ∧ true) 
c  in CNF:
c    -b^{39, 10}_2 ∨  b^{39, 10}_1 ∨  b^{39, 10}_0 ∨ false 
c  in DIMACS:
-15989  15990  15991  0

c  3 does not represent an automaton state.
c    -(-b^{39, 10}_2 ∧  b^{39, 10}_1 ∧  b^{39, 10}_0 ∧ true) 
c  in CNF:
c     b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ false 
c  in DIMACS:
 15989 -15990 -15991  0
c  -3 does not represent an automaton state.
c    -( b^{39, 10}_2 ∧  b^{39, 10}_1 ∧  b^{39, 10}_0 ∧ true) 
c  in CNF:
c    -b^{39, 10}_2 ∨ -b^{39, 10}_1 ∨ -b^{39, 10}_0 ∨ false 
c  in DIMACS:
-15989 -15990 -15991  0

c i = 11
c  -2+1 --> -1
c    ( b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧  p_429) -> ( b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0)
c  in CNF:
c    -b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨  b^{39, 12}_2
c    -b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_1
c    -b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨  b^{39, 12}_0
c  in DIMACS:
-15992 -15993  15994 -429  15995 0
-15992 -15993  15994 -429 -15996 0
-15992 -15993  15994 -429  15997 0

c  -1+1 --> 0
c    ( b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0 ∧  p_429) -> (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧ -b^{39, 12}_0)
c  in CNF:
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_2
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_1
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_0
c  in DIMACS:
-15992  15993 -15994 -429 -15995 0
-15992  15993 -15994 -429 -15996 0
-15992  15993 -15994 -429 -15997 0

c  0+1 --> 1
c    (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧  p_429) -> (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0)
c  in CNF:
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_2
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_1
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨  b^{39, 12}_0
c  in DIMACS:
 15992  15993  15994 -429 -15995 0
 15992  15993  15994 -429 -15996 0
 15992  15993  15994 -429  15997 0

c  1+1 --> 2
c    (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0 ∧  p_429) -> (-b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0)
c  in CNF:
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_2
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨  b^{39, 12}_1
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ -p_429 ∨ -b^{39, 12}_0
c  in DIMACS:
 15992  15993 -15994 -429 -15995 0
 15992  15993 -15994 -429  15996 0
 15992  15993 -15994 -429 -15997 0

c  2+1 --> break 
c    (-b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧  p_429) -> break
c  in CNF:
c     b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 15992 -15993  15994 -429 1162 0


c  2-1 --> 1
c    (-b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧ -p_429) -> (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0)
c  in CNF:
c     b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_2
c     b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_1
c     b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨  b^{39, 12}_0
c  in DIMACS:
 15992 -15993  15994  429 -15995 0
 15992 -15993  15994  429 -15996 0
 15992 -15993  15994  429  15997 0

c  1-1 --> 0
c    (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0 ∧ -p_429) -> (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧ -b^{39, 12}_0)
c  in CNF:
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_2
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_1
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_0
c  in DIMACS:
 15992  15993 -15994  429 -15995 0
 15992  15993 -15994  429 -15996 0
 15992  15993 -15994  429 -15997 0

c  0-1 --> -1
c    (-b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧ -p_429) -> ( b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0)
c  in CNF:
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨  b^{39, 12}_2
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_1
c     b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨  b^{39, 12}_0
c  in DIMACS:
 15992  15993  15994  429  15995 0
 15992  15993  15994  429 -15996 0
 15992  15993  15994  429  15997 0

c  -1-1 --> -2
c    ( b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧  b^{39, 11}_0 ∧ -p_429) -> ( b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0)
c  in CNF:
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨  b^{39, 12}_2
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨  b^{39, 12}_1
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨  p_429 ∨ -b^{39, 12}_0
c  in DIMACS:
-15992  15993 -15994  429  15995 0
-15992  15993 -15994  429  15996 0
-15992  15993 -15994  429 -15997 0

c  -2-1 --> break 
c    ( b^{39, 11}_2 ∧  b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨  b^{39, 11}_0 ∨  p_429 ∨ break
c  in DIMACS:
-15992 -15993  15994  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 11}_2 ∧ -b^{39, 11}_1 ∧ -b^{39, 11}_0 ∧ true) 
c  in CNF:
c    -b^{39, 11}_2 ∨  b^{39, 11}_1 ∨  b^{39, 11}_0 ∨ false 
c  in DIMACS:
-15992  15993  15994  0

c  3 does not represent an automaton state.
c    -(-b^{39, 11}_2 ∧  b^{39, 11}_1 ∧  b^{39, 11}_0 ∧ true) 
c  in CNF:
c     b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ false 
c  in DIMACS:
 15992 -15993 -15994  0
c  -3 does not represent an automaton state.
c    -( b^{39, 11}_2 ∧  b^{39, 11}_1 ∧  b^{39, 11}_0 ∧ true) 
c  in CNF:
c    -b^{39, 11}_2 ∨ -b^{39, 11}_1 ∨ -b^{39, 11}_0 ∨ false 
c  in DIMACS:
-15992 -15993 -15994  0

c i = 12
c  -2+1 --> -1
c    ( b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧  p_468) -> ( b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0)
c  in CNF:
c    -b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨  b^{39, 13}_2
c    -b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_1
c    -b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨  b^{39, 13}_0
c  in DIMACS:
-15995 -15996  15997 -468  15998 0
-15995 -15996  15997 -468 -15999 0
-15995 -15996  15997 -468  16000 0

c  -1+1 --> 0
c    ( b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0 ∧  p_468) -> (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧ -b^{39, 13}_0)
c  in CNF:
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_2
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_1
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_0
c  in DIMACS:
-15995  15996 -15997 -468 -15998 0
-15995  15996 -15997 -468 -15999 0
-15995  15996 -15997 -468 -16000 0

c  0+1 --> 1
c    (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧  p_468) -> (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0)
c  in CNF:
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_2
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_1
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨  b^{39, 13}_0
c  in DIMACS:
 15995  15996  15997 -468 -15998 0
 15995  15996  15997 -468 -15999 0
 15995  15996  15997 -468  16000 0

c  1+1 --> 2
c    (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0 ∧  p_468) -> (-b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0)
c  in CNF:
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_2
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨  b^{39, 13}_1
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ -p_468 ∨ -b^{39, 13}_0
c  in DIMACS:
 15995  15996 -15997 -468 -15998 0
 15995  15996 -15997 -468  15999 0
 15995  15996 -15997 -468 -16000 0

c  2+1 --> break 
c    (-b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧  p_468) -> break
c  in CNF:
c     b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 15995 -15996  15997 -468 1162 0


c  2-1 --> 1
c    (-b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧ -p_468) -> (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0)
c  in CNF:
c     b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_2
c     b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_1
c     b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨  b^{39, 13}_0
c  in DIMACS:
 15995 -15996  15997  468 -15998 0
 15995 -15996  15997  468 -15999 0
 15995 -15996  15997  468  16000 0

c  1-1 --> 0
c    (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0 ∧ -p_468) -> (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧ -b^{39, 13}_0)
c  in CNF:
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_2
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_1
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_0
c  in DIMACS:
 15995  15996 -15997  468 -15998 0
 15995  15996 -15997  468 -15999 0
 15995  15996 -15997  468 -16000 0

c  0-1 --> -1
c    (-b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧ -p_468) -> ( b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0)
c  in CNF:
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨  b^{39, 13}_2
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_1
c     b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨  b^{39, 13}_0
c  in DIMACS:
 15995  15996  15997  468  15998 0
 15995  15996  15997  468 -15999 0
 15995  15996  15997  468  16000 0

c  -1-1 --> -2
c    ( b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧  b^{39, 12}_0 ∧ -p_468) -> ( b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0)
c  in CNF:
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨  b^{39, 13}_2
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨  b^{39, 13}_1
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨  p_468 ∨ -b^{39, 13}_0
c  in DIMACS:
-15995  15996 -15997  468  15998 0
-15995  15996 -15997  468  15999 0
-15995  15996 -15997  468 -16000 0

c  -2-1 --> break 
c    ( b^{39, 12}_2 ∧  b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨  b^{39, 12}_0 ∨  p_468 ∨ break
c  in DIMACS:
-15995 -15996  15997  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 12}_2 ∧ -b^{39, 12}_1 ∧ -b^{39, 12}_0 ∧ true) 
c  in CNF:
c    -b^{39, 12}_2 ∨  b^{39, 12}_1 ∨  b^{39, 12}_0 ∨ false 
c  in DIMACS:
-15995  15996  15997  0

c  3 does not represent an automaton state.
c    -(-b^{39, 12}_2 ∧  b^{39, 12}_1 ∧  b^{39, 12}_0 ∧ true) 
c  in CNF:
c     b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ false 
c  in DIMACS:
 15995 -15996 -15997  0
c  -3 does not represent an automaton state.
c    -( b^{39, 12}_2 ∧  b^{39, 12}_1 ∧  b^{39, 12}_0 ∧ true) 
c  in CNF:
c    -b^{39, 12}_2 ∨ -b^{39, 12}_1 ∨ -b^{39, 12}_0 ∨ false 
c  in DIMACS:
-15995 -15996 -15997  0

c i = 13
c  -2+1 --> -1
c    ( b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧  p_507) -> ( b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0)
c  in CNF:
c    -b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨  b^{39, 14}_2
c    -b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_1
c    -b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨  b^{39, 14}_0
c  in DIMACS:
-15998 -15999  16000 -507  16001 0
-15998 -15999  16000 -507 -16002 0
-15998 -15999  16000 -507  16003 0

c  -1+1 --> 0
c    ( b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0 ∧  p_507) -> (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧ -b^{39, 14}_0)
c  in CNF:
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_2
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_1
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_0
c  in DIMACS:
-15998  15999 -16000 -507 -16001 0
-15998  15999 -16000 -507 -16002 0
-15998  15999 -16000 -507 -16003 0

c  0+1 --> 1
c    (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧  p_507) -> (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0)
c  in CNF:
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_2
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_1
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨  b^{39, 14}_0
c  in DIMACS:
 15998  15999  16000 -507 -16001 0
 15998  15999  16000 -507 -16002 0
 15998  15999  16000 -507  16003 0

c  1+1 --> 2
c    (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0 ∧  p_507) -> (-b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0)
c  in CNF:
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_2
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨  b^{39, 14}_1
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ -p_507 ∨ -b^{39, 14}_0
c  in DIMACS:
 15998  15999 -16000 -507 -16001 0
 15998  15999 -16000 -507  16002 0
 15998  15999 -16000 -507 -16003 0

c  2+1 --> break 
c    (-b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧  p_507) -> break
c  in CNF:
c     b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ -p_507 ∨ break
c  in DIMACS:
 15998 -15999  16000 -507 1162 0


c  2-1 --> 1
c    (-b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧ -p_507) -> (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0)
c  in CNF:
c     b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_2
c     b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_1
c     b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨  b^{39, 14}_0
c  in DIMACS:
 15998 -15999  16000  507 -16001 0
 15998 -15999  16000  507 -16002 0
 15998 -15999  16000  507  16003 0

c  1-1 --> 0
c    (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0 ∧ -p_507) -> (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧ -b^{39, 14}_0)
c  in CNF:
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_2
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_1
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_0
c  in DIMACS:
 15998  15999 -16000  507 -16001 0
 15998  15999 -16000  507 -16002 0
 15998  15999 -16000  507 -16003 0

c  0-1 --> -1
c    (-b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧ -p_507) -> ( b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0)
c  in CNF:
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨  b^{39, 14}_2
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_1
c     b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨  b^{39, 14}_0
c  in DIMACS:
 15998  15999  16000  507  16001 0
 15998  15999  16000  507 -16002 0
 15998  15999  16000  507  16003 0

c  -1-1 --> -2
c    ( b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧  b^{39, 13}_0 ∧ -p_507) -> ( b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0)
c  in CNF:
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨  b^{39, 14}_2
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨  b^{39, 14}_1
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨  p_507 ∨ -b^{39, 14}_0
c  in DIMACS:
-15998  15999 -16000  507  16001 0
-15998  15999 -16000  507  16002 0
-15998  15999 -16000  507 -16003 0

c  -2-1 --> break 
c    ( b^{39, 13}_2 ∧  b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧ -p_507) -> break
c  in CNF:
c    -b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨  b^{39, 13}_0 ∨  p_507 ∨ break
c  in DIMACS:
-15998 -15999  16000  507 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 13}_2 ∧ -b^{39, 13}_1 ∧ -b^{39, 13}_0 ∧ true) 
c  in CNF:
c    -b^{39, 13}_2 ∨  b^{39, 13}_1 ∨  b^{39, 13}_0 ∨ false 
c  in DIMACS:
-15998  15999  16000  0

c  3 does not represent an automaton state.
c    -(-b^{39, 13}_2 ∧  b^{39, 13}_1 ∧  b^{39, 13}_0 ∧ true) 
c  in CNF:
c     b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ false 
c  in DIMACS:
 15998 -15999 -16000  0
c  -3 does not represent an automaton state.
c    -( b^{39, 13}_2 ∧  b^{39, 13}_1 ∧  b^{39, 13}_0 ∧ true) 
c  in CNF:
c    -b^{39, 13}_2 ∨ -b^{39, 13}_1 ∨ -b^{39, 13}_0 ∨ false 
c  in DIMACS:
-15998 -15999 -16000  0

c i = 14
c  -2+1 --> -1
c    ( b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧  p_546) -> ( b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0)
c  in CNF:
c    -b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨  b^{39, 15}_2
c    -b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_1
c    -b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨  b^{39, 15}_0
c  in DIMACS:
-16001 -16002  16003 -546  16004 0
-16001 -16002  16003 -546 -16005 0
-16001 -16002  16003 -546  16006 0

c  -1+1 --> 0
c    ( b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0 ∧  p_546) -> (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧ -b^{39, 15}_0)
c  in CNF:
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_2
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_1
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_0
c  in DIMACS:
-16001  16002 -16003 -546 -16004 0
-16001  16002 -16003 -546 -16005 0
-16001  16002 -16003 -546 -16006 0

c  0+1 --> 1
c    (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧  p_546) -> (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0)
c  in CNF:
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_2
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_1
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨  b^{39, 15}_0
c  in DIMACS:
 16001  16002  16003 -546 -16004 0
 16001  16002  16003 -546 -16005 0
 16001  16002  16003 -546  16006 0

c  1+1 --> 2
c    (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0 ∧  p_546) -> (-b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0)
c  in CNF:
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_2
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨  b^{39, 15}_1
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ -p_546 ∨ -b^{39, 15}_0
c  in DIMACS:
 16001  16002 -16003 -546 -16004 0
 16001  16002 -16003 -546  16005 0
 16001  16002 -16003 -546 -16006 0

c  2+1 --> break 
c    (-b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧  p_546) -> break
c  in CNF:
c     b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 16001 -16002  16003 -546 1162 0


c  2-1 --> 1
c    (-b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧ -p_546) -> (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0)
c  in CNF:
c     b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_2
c     b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_1
c     b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨  b^{39, 15}_0
c  in DIMACS:
 16001 -16002  16003  546 -16004 0
 16001 -16002  16003  546 -16005 0
 16001 -16002  16003  546  16006 0

c  1-1 --> 0
c    (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0 ∧ -p_546) -> (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧ -b^{39, 15}_0)
c  in CNF:
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_2
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_1
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_0
c  in DIMACS:
 16001  16002 -16003  546 -16004 0
 16001  16002 -16003  546 -16005 0
 16001  16002 -16003  546 -16006 0

c  0-1 --> -1
c    (-b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧ -p_546) -> ( b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0)
c  in CNF:
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨  b^{39, 15}_2
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_1
c     b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨  b^{39, 15}_0
c  in DIMACS:
 16001  16002  16003  546  16004 0
 16001  16002  16003  546 -16005 0
 16001  16002  16003  546  16006 0

c  -1-1 --> -2
c    ( b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧  b^{39, 14}_0 ∧ -p_546) -> ( b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0)
c  in CNF:
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨  b^{39, 15}_2
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨  b^{39, 15}_1
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨  p_546 ∨ -b^{39, 15}_0
c  in DIMACS:
-16001  16002 -16003  546  16004 0
-16001  16002 -16003  546  16005 0
-16001  16002 -16003  546 -16006 0

c  -2-1 --> break 
c    ( b^{39, 14}_2 ∧  b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨  b^{39, 14}_0 ∨  p_546 ∨ break
c  in DIMACS:
-16001 -16002  16003  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 14}_2 ∧ -b^{39, 14}_1 ∧ -b^{39, 14}_0 ∧ true) 
c  in CNF:
c    -b^{39, 14}_2 ∨  b^{39, 14}_1 ∨  b^{39, 14}_0 ∨ false 
c  in DIMACS:
-16001  16002  16003  0

c  3 does not represent an automaton state.
c    -(-b^{39, 14}_2 ∧  b^{39, 14}_1 ∧  b^{39, 14}_0 ∧ true) 
c  in CNF:
c     b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ false 
c  in DIMACS:
 16001 -16002 -16003  0
c  -3 does not represent an automaton state.
c    -( b^{39, 14}_2 ∧  b^{39, 14}_1 ∧  b^{39, 14}_0 ∧ true) 
c  in CNF:
c    -b^{39, 14}_2 ∨ -b^{39, 14}_1 ∨ -b^{39, 14}_0 ∨ false 
c  in DIMACS:
-16001 -16002 -16003  0

c i = 15
c  -2+1 --> -1
c    ( b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧  p_585) -> ( b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0)
c  in CNF:
c    -b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨  b^{39, 16}_2
c    -b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_1
c    -b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨  b^{39, 16}_0
c  in DIMACS:
-16004 -16005  16006 -585  16007 0
-16004 -16005  16006 -585 -16008 0
-16004 -16005  16006 -585  16009 0

c  -1+1 --> 0
c    ( b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0 ∧  p_585) -> (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧ -b^{39, 16}_0)
c  in CNF:
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_2
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_1
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_0
c  in DIMACS:
-16004  16005 -16006 -585 -16007 0
-16004  16005 -16006 -585 -16008 0
-16004  16005 -16006 -585 -16009 0

c  0+1 --> 1
c    (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧  p_585) -> (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0)
c  in CNF:
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_2
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_1
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨  b^{39, 16}_0
c  in DIMACS:
 16004  16005  16006 -585 -16007 0
 16004  16005  16006 -585 -16008 0
 16004  16005  16006 -585  16009 0

c  1+1 --> 2
c    (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0 ∧  p_585) -> (-b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0)
c  in CNF:
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_2
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨  b^{39, 16}_1
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ -p_585 ∨ -b^{39, 16}_0
c  in DIMACS:
 16004  16005 -16006 -585 -16007 0
 16004  16005 -16006 -585  16008 0
 16004  16005 -16006 -585 -16009 0

c  2+1 --> break 
c    (-b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧  p_585) -> break
c  in CNF:
c     b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 16004 -16005  16006 -585 1162 0


c  2-1 --> 1
c    (-b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧ -p_585) -> (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0)
c  in CNF:
c     b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_2
c     b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_1
c     b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨  b^{39, 16}_0
c  in DIMACS:
 16004 -16005  16006  585 -16007 0
 16004 -16005  16006  585 -16008 0
 16004 -16005  16006  585  16009 0

c  1-1 --> 0
c    (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0 ∧ -p_585) -> (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧ -b^{39, 16}_0)
c  in CNF:
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_2
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_1
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_0
c  in DIMACS:
 16004  16005 -16006  585 -16007 0
 16004  16005 -16006  585 -16008 0
 16004  16005 -16006  585 -16009 0

c  0-1 --> -1
c    (-b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧ -p_585) -> ( b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0)
c  in CNF:
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨  b^{39, 16}_2
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_1
c     b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨  b^{39, 16}_0
c  in DIMACS:
 16004  16005  16006  585  16007 0
 16004  16005  16006  585 -16008 0
 16004  16005  16006  585  16009 0

c  -1-1 --> -2
c    ( b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧  b^{39, 15}_0 ∧ -p_585) -> ( b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0)
c  in CNF:
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨  b^{39, 16}_2
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨  b^{39, 16}_1
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨  p_585 ∨ -b^{39, 16}_0
c  in DIMACS:
-16004  16005 -16006  585  16007 0
-16004  16005 -16006  585  16008 0
-16004  16005 -16006  585 -16009 0

c  -2-1 --> break 
c    ( b^{39, 15}_2 ∧  b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨  b^{39, 15}_0 ∨  p_585 ∨ break
c  in DIMACS:
-16004 -16005  16006  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 15}_2 ∧ -b^{39, 15}_1 ∧ -b^{39, 15}_0 ∧ true) 
c  in CNF:
c    -b^{39, 15}_2 ∨  b^{39, 15}_1 ∨  b^{39, 15}_0 ∨ false 
c  in DIMACS:
-16004  16005  16006  0

c  3 does not represent an automaton state.
c    -(-b^{39, 15}_2 ∧  b^{39, 15}_1 ∧  b^{39, 15}_0 ∧ true) 
c  in CNF:
c     b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ false 
c  in DIMACS:
 16004 -16005 -16006  0
c  -3 does not represent an automaton state.
c    -( b^{39, 15}_2 ∧  b^{39, 15}_1 ∧  b^{39, 15}_0 ∧ true) 
c  in CNF:
c    -b^{39, 15}_2 ∨ -b^{39, 15}_1 ∨ -b^{39, 15}_0 ∨ false 
c  in DIMACS:
-16004 -16005 -16006  0

c i = 16
c  -2+1 --> -1
c    ( b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧  p_624) -> ( b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0)
c  in CNF:
c    -b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨  b^{39, 17}_2
c    -b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_1
c    -b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨  b^{39, 17}_0
c  in DIMACS:
-16007 -16008  16009 -624  16010 0
-16007 -16008  16009 -624 -16011 0
-16007 -16008  16009 -624  16012 0

c  -1+1 --> 0
c    ( b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0 ∧  p_624) -> (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧ -b^{39, 17}_0)
c  in CNF:
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_2
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_1
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_0
c  in DIMACS:
-16007  16008 -16009 -624 -16010 0
-16007  16008 -16009 -624 -16011 0
-16007  16008 -16009 -624 -16012 0

c  0+1 --> 1
c    (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧  p_624) -> (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0)
c  in CNF:
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_2
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_1
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨  b^{39, 17}_0
c  in DIMACS:
 16007  16008  16009 -624 -16010 0
 16007  16008  16009 -624 -16011 0
 16007  16008  16009 -624  16012 0

c  1+1 --> 2
c    (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0 ∧  p_624) -> (-b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0)
c  in CNF:
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_2
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨  b^{39, 17}_1
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ -p_624 ∨ -b^{39, 17}_0
c  in DIMACS:
 16007  16008 -16009 -624 -16010 0
 16007  16008 -16009 -624  16011 0
 16007  16008 -16009 -624 -16012 0

c  2+1 --> break 
c    (-b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧  p_624) -> break
c  in CNF:
c     b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 16007 -16008  16009 -624 1162 0


c  2-1 --> 1
c    (-b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧ -p_624) -> (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0)
c  in CNF:
c     b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_2
c     b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_1
c     b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨  b^{39, 17}_0
c  in DIMACS:
 16007 -16008  16009  624 -16010 0
 16007 -16008  16009  624 -16011 0
 16007 -16008  16009  624  16012 0

c  1-1 --> 0
c    (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0 ∧ -p_624) -> (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧ -b^{39, 17}_0)
c  in CNF:
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_2
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_1
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_0
c  in DIMACS:
 16007  16008 -16009  624 -16010 0
 16007  16008 -16009  624 -16011 0
 16007  16008 -16009  624 -16012 0

c  0-1 --> -1
c    (-b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧ -p_624) -> ( b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0)
c  in CNF:
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨  b^{39, 17}_2
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_1
c     b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨  b^{39, 17}_0
c  in DIMACS:
 16007  16008  16009  624  16010 0
 16007  16008  16009  624 -16011 0
 16007  16008  16009  624  16012 0

c  -1-1 --> -2
c    ( b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧  b^{39, 16}_0 ∧ -p_624) -> ( b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0)
c  in CNF:
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨  b^{39, 17}_2
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨  b^{39, 17}_1
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨  p_624 ∨ -b^{39, 17}_0
c  in DIMACS:
-16007  16008 -16009  624  16010 0
-16007  16008 -16009  624  16011 0
-16007  16008 -16009  624 -16012 0

c  -2-1 --> break 
c    ( b^{39, 16}_2 ∧  b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨  b^{39, 16}_0 ∨  p_624 ∨ break
c  in DIMACS:
-16007 -16008  16009  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 16}_2 ∧ -b^{39, 16}_1 ∧ -b^{39, 16}_0 ∧ true) 
c  in CNF:
c    -b^{39, 16}_2 ∨  b^{39, 16}_1 ∨  b^{39, 16}_0 ∨ false 
c  in DIMACS:
-16007  16008  16009  0

c  3 does not represent an automaton state.
c    -(-b^{39, 16}_2 ∧  b^{39, 16}_1 ∧  b^{39, 16}_0 ∧ true) 
c  in CNF:
c     b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ false 
c  in DIMACS:
 16007 -16008 -16009  0
c  -3 does not represent an automaton state.
c    -( b^{39, 16}_2 ∧  b^{39, 16}_1 ∧  b^{39, 16}_0 ∧ true) 
c  in CNF:
c    -b^{39, 16}_2 ∨ -b^{39, 16}_1 ∨ -b^{39, 16}_0 ∨ false 
c  in DIMACS:
-16007 -16008 -16009  0

c i = 17
c  -2+1 --> -1
c    ( b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧  p_663) -> ( b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0)
c  in CNF:
c    -b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨  b^{39, 18}_2
c    -b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_1
c    -b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨  b^{39, 18}_0
c  in DIMACS:
-16010 -16011  16012 -663  16013 0
-16010 -16011  16012 -663 -16014 0
-16010 -16011  16012 -663  16015 0

c  -1+1 --> 0
c    ( b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0 ∧  p_663) -> (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧ -b^{39, 18}_0)
c  in CNF:
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_2
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_1
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_0
c  in DIMACS:
-16010  16011 -16012 -663 -16013 0
-16010  16011 -16012 -663 -16014 0
-16010  16011 -16012 -663 -16015 0

c  0+1 --> 1
c    (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧  p_663) -> (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0)
c  in CNF:
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_2
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_1
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨  b^{39, 18}_0
c  in DIMACS:
 16010  16011  16012 -663 -16013 0
 16010  16011  16012 -663 -16014 0
 16010  16011  16012 -663  16015 0

c  1+1 --> 2
c    (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0 ∧  p_663) -> (-b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0)
c  in CNF:
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_2
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨  b^{39, 18}_1
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ -p_663 ∨ -b^{39, 18}_0
c  in DIMACS:
 16010  16011 -16012 -663 -16013 0
 16010  16011 -16012 -663  16014 0
 16010  16011 -16012 -663 -16015 0

c  2+1 --> break 
c    (-b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧  p_663) -> break
c  in CNF:
c     b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 16010 -16011  16012 -663 1162 0


c  2-1 --> 1
c    (-b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧ -p_663) -> (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0)
c  in CNF:
c     b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_2
c     b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_1
c     b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨  b^{39, 18}_0
c  in DIMACS:
 16010 -16011  16012  663 -16013 0
 16010 -16011  16012  663 -16014 0
 16010 -16011  16012  663  16015 0

c  1-1 --> 0
c    (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0 ∧ -p_663) -> (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧ -b^{39, 18}_0)
c  in CNF:
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_2
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_1
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_0
c  in DIMACS:
 16010  16011 -16012  663 -16013 0
 16010  16011 -16012  663 -16014 0
 16010  16011 -16012  663 -16015 0

c  0-1 --> -1
c    (-b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧ -p_663) -> ( b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0)
c  in CNF:
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨  b^{39, 18}_2
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_1
c     b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨  b^{39, 18}_0
c  in DIMACS:
 16010  16011  16012  663  16013 0
 16010  16011  16012  663 -16014 0
 16010  16011  16012  663  16015 0

c  -1-1 --> -2
c    ( b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧  b^{39, 17}_0 ∧ -p_663) -> ( b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0)
c  in CNF:
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨  b^{39, 18}_2
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨  b^{39, 18}_1
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨  p_663 ∨ -b^{39, 18}_0
c  in DIMACS:
-16010  16011 -16012  663  16013 0
-16010  16011 -16012  663  16014 0
-16010  16011 -16012  663 -16015 0

c  -2-1 --> break 
c    ( b^{39, 17}_2 ∧  b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨  b^{39, 17}_0 ∨  p_663 ∨ break
c  in DIMACS:
-16010 -16011  16012  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 17}_2 ∧ -b^{39, 17}_1 ∧ -b^{39, 17}_0 ∧ true) 
c  in CNF:
c    -b^{39, 17}_2 ∨  b^{39, 17}_1 ∨  b^{39, 17}_0 ∨ false 
c  in DIMACS:
-16010  16011  16012  0

c  3 does not represent an automaton state.
c    -(-b^{39, 17}_2 ∧  b^{39, 17}_1 ∧  b^{39, 17}_0 ∧ true) 
c  in CNF:
c     b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ false 
c  in DIMACS:
 16010 -16011 -16012  0
c  -3 does not represent an automaton state.
c    -( b^{39, 17}_2 ∧  b^{39, 17}_1 ∧  b^{39, 17}_0 ∧ true) 
c  in CNF:
c    -b^{39, 17}_2 ∨ -b^{39, 17}_1 ∨ -b^{39, 17}_0 ∨ false 
c  in DIMACS:
-16010 -16011 -16012  0

c i = 18
c  -2+1 --> -1
c    ( b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧  p_702) -> ( b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0)
c  in CNF:
c    -b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨  b^{39, 19}_2
c    -b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_1
c    -b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨  b^{39, 19}_0
c  in DIMACS:
-16013 -16014  16015 -702  16016 0
-16013 -16014  16015 -702 -16017 0
-16013 -16014  16015 -702  16018 0

c  -1+1 --> 0
c    ( b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0 ∧  p_702) -> (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧ -b^{39, 19}_0)
c  in CNF:
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_2
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_1
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_0
c  in DIMACS:
-16013  16014 -16015 -702 -16016 0
-16013  16014 -16015 -702 -16017 0
-16013  16014 -16015 -702 -16018 0

c  0+1 --> 1
c    (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧  p_702) -> (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0)
c  in CNF:
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_2
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_1
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨  b^{39, 19}_0
c  in DIMACS:
 16013  16014  16015 -702 -16016 0
 16013  16014  16015 -702 -16017 0
 16013  16014  16015 -702  16018 0

c  1+1 --> 2
c    (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0 ∧  p_702) -> (-b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0)
c  in CNF:
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_2
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨  b^{39, 19}_1
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ -p_702 ∨ -b^{39, 19}_0
c  in DIMACS:
 16013  16014 -16015 -702 -16016 0
 16013  16014 -16015 -702  16017 0
 16013  16014 -16015 -702 -16018 0

c  2+1 --> break 
c    (-b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧  p_702) -> break
c  in CNF:
c     b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 16013 -16014  16015 -702 1162 0


c  2-1 --> 1
c    (-b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧ -p_702) -> (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0)
c  in CNF:
c     b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_2
c     b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_1
c     b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨  b^{39, 19}_0
c  in DIMACS:
 16013 -16014  16015  702 -16016 0
 16013 -16014  16015  702 -16017 0
 16013 -16014  16015  702  16018 0

c  1-1 --> 0
c    (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0 ∧ -p_702) -> (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧ -b^{39, 19}_0)
c  in CNF:
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_2
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_1
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_0
c  in DIMACS:
 16013  16014 -16015  702 -16016 0
 16013  16014 -16015  702 -16017 0
 16013  16014 -16015  702 -16018 0

c  0-1 --> -1
c    (-b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧ -p_702) -> ( b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0)
c  in CNF:
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨  b^{39, 19}_2
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_1
c     b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨  b^{39, 19}_0
c  in DIMACS:
 16013  16014  16015  702  16016 0
 16013  16014  16015  702 -16017 0
 16013  16014  16015  702  16018 0

c  -1-1 --> -2
c    ( b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧  b^{39, 18}_0 ∧ -p_702) -> ( b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0)
c  in CNF:
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨  b^{39, 19}_2
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨  b^{39, 19}_1
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨  p_702 ∨ -b^{39, 19}_0
c  in DIMACS:
-16013  16014 -16015  702  16016 0
-16013  16014 -16015  702  16017 0
-16013  16014 -16015  702 -16018 0

c  -2-1 --> break 
c    ( b^{39, 18}_2 ∧  b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨  b^{39, 18}_0 ∨  p_702 ∨ break
c  in DIMACS:
-16013 -16014  16015  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 18}_2 ∧ -b^{39, 18}_1 ∧ -b^{39, 18}_0 ∧ true) 
c  in CNF:
c    -b^{39, 18}_2 ∨  b^{39, 18}_1 ∨  b^{39, 18}_0 ∨ false 
c  in DIMACS:
-16013  16014  16015  0

c  3 does not represent an automaton state.
c    -(-b^{39, 18}_2 ∧  b^{39, 18}_1 ∧  b^{39, 18}_0 ∧ true) 
c  in CNF:
c     b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ false 
c  in DIMACS:
 16013 -16014 -16015  0
c  -3 does not represent an automaton state.
c    -( b^{39, 18}_2 ∧  b^{39, 18}_1 ∧  b^{39, 18}_0 ∧ true) 
c  in CNF:
c    -b^{39, 18}_2 ∨ -b^{39, 18}_1 ∨ -b^{39, 18}_0 ∨ false 
c  in DIMACS:
-16013 -16014 -16015  0

c i = 19
c  -2+1 --> -1
c    ( b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧  p_741) -> ( b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0)
c  in CNF:
c    -b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨  b^{39, 20}_2
c    -b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_1
c    -b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨  b^{39, 20}_0
c  in DIMACS:
-16016 -16017  16018 -741  16019 0
-16016 -16017  16018 -741 -16020 0
-16016 -16017  16018 -741  16021 0

c  -1+1 --> 0
c    ( b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0 ∧  p_741) -> (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧ -b^{39, 20}_0)
c  in CNF:
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_2
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_1
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_0
c  in DIMACS:
-16016  16017 -16018 -741 -16019 0
-16016  16017 -16018 -741 -16020 0
-16016  16017 -16018 -741 -16021 0

c  0+1 --> 1
c    (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧  p_741) -> (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0)
c  in CNF:
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_2
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_1
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨  b^{39, 20}_0
c  in DIMACS:
 16016  16017  16018 -741 -16019 0
 16016  16017  16018 -741 -16020 0
 16016  16017  16018 -741  16021 0

c  1+1 --> 2
c    (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0 ∧  p_741) -> (-b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0)
c  in CNF:
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_2
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨  b^{39, 20}_1
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ -p_741 ∨ -b^{39, 20}_0
c  in DIMACS:
 16016  16017 -16018 -741 -16019 0
 16016  16017 -16018 -741  16020 0
 16016  16017 -16018 -741 -16021 0

c  2+1 --> break 
c    (-b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧  p_741) -> break
c  in CNF:
c     b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 16016 -16017  16018 -741 1162 0


c  2-1 --> 1
c    (-b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧ -p_741) -> (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0)
c  in CNF:
c     b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_2
c     b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_1
c     b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨  b^{39, 20}_0
c  in DIMACS:
 16016 -16017  16018  741 -16019 0
 16016 -16017  16018  741 -16020 0
 16016 -16017  16018  741  16021 0

c  1-1 --> 0
c    (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0 ∧ -p_741) -> (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧ -b^{39, 20}_0)
c  in CNF:
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_2
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_1
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_0
c  in DIMACS:
 16016  16017 -16018  741 -16019 0
 16016  16017 -16018  741 -16020 0
 16016  16017 -16018  741 -16021 0

c  0-1 --> -1
c    (-b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧ -p_741) -> ( b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0)
c  in CNF:
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨  b^{39, 20}_2
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_1
c     b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨  b^{39, 20}_0
c  in DIMACS:
 16016  16017  16018  741  16019 0
 16016  16017  16018  741 -16020 0
 16016  16017  16018  741  16021 0

c  -1-1 --> -2
c    ( b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧  b^{39, 19}_0 ∧ -p_741) -> ( b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0)
c  in CNF:
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨  b^{39, 20}_2
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨  b^{39, 20}_1
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨  p_741 ∨ -b^{39, 20}_0
c  in DIMACS:
-16016  16017 -16018  741  16019 0
-16016  16017 -16018  741  16020 0
-16016  16017 -16018  741 -16021 0

c  -2-1 --> break 
c    ( b^{39, 19}_2 ∧  b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨  b^{39, 19}_0 ∨  p_741 ∨ break
c  in DIMACS:
-16016 -16017  16018  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 19}_2 ∧ -b^{39, 19}_1 ∧ -b^{39, 19}_0 ∧ true) 
c  in CNF:
c    -b^{39, 19}_2 ∨  b^{39, 19}_1 ∨  b^{39, 19}_0 ∨ false 
c  in DIMACS:
-16016  16017  16018  0

c  3 does not represent an automaton state.
c    -(-b^{39, 19}_2 ∧  b^{39, 19}_1 ∧  b^{39, 19}_0 ∧ true) 
c  in CNF:
c     b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ false 
c  in DIMACS:
 16016 -16017 -16018  0
c  -3 does not represent an automaton state.
c    -( b^{39, 19}_2 ∧  b^{39, 19}_1 ∧  b^{39, 19}_0 ∧ true) 
c  in CNF:
c    -b^{39, 19}_2 ∨ -b^{39, 19}_1 ∨ -b^{39, 19}_0 ∨ false 
c  in DIMACS:
-16016 -16017 -16018  0

c i = 20
c  -2+1 --> -1
c    ( b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧  p_780) -> ( b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0)
c  in CNF:
c    -b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨  b^{39, 21}_2
c    -b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_1
c    -b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨  b^{39, 21}_0
c  in DIMACS:
-16019 -16020  16021 -780  16022 0
-16019 -16020  16021 -780 -16023 0
-16019 -16020  16021 -780  16024 0

c  -1+1 --> 0
c    ( b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0 ∧  p_780) -> (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧ -b^{39, 21}_0)
c  in CNF:
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_2
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_1
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_0
c  in DIMACS:
-16019  16020 -16021 -780 -16022 0
-16019  16020 -16021 -780 -16023 0
-16019  16020 -16021 -780 -16024 0

c  0+1 --> 1
c    (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧  p_780) -> (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0)
c  in CNF:
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_2
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_1
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨  b^{39, 21}_0
c  in DIMACS:
 16019  16020  16021 -780 -16022 0
 16019  16020  16021 -780 -16023 0
 16019  16020  16021 -780  16024 0

c  1+1 --> 2
c    (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0 ∧  p_780) -> (-b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0)
c  in CNF:
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_2
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨  b^{39, 21}_1
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ -p_780 ∨ -b^{39, 21}_0
c  in DIMACS:
 16019  16020 -16021 -780 -16022 0
 16019  16020 -16021 -780  16023 0
 16019  16020 -16021 -780 -16024 0

c  2+1 --> break 
c    (-b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧  p_780) -> break
c  in CNF:
c     b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 16019 -16020  16021 -780 1162 0


c  2-1 --> 1
c    (-b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧ -p_780) -> (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0)
c  in CNF:
c     b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_2
c     b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_1
c     b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨  b^{39, 21}_0
c  in DIMACS:
 16019 -16020  16021  780 -16022 0
 16019 -16020  16021  780 -16023 0
 16019 -16020  16021  780  16024 0

c  1-1 --> 0
c    (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0 ∧ -p_780) -> (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧ -b^{39, 21}_0)
c  in CNF:
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_2
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_1
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_0
c  in DIMACS:
 16019  16020 -16021  780 -16022 0
 16019  16020 -16021  780 -16023 0
 16019  16020 -16021  780 -16024 0

c  0-1 --> -1
c    (-b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧ -p_780) -> ( b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0)
c  in CNF:
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨  b^{39, 21}_2
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_1
c     b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨  b^{39, 21}_0
c  in DIMACS:
 16019  16020  16021  780  16022 0
 16019  16020  16021  780 -16023 0
 16019  16020  16021  780  16024 0

c  -1-1 --> -2
c    ( b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧  b^{39, 20}_0 ∧ -p_780) -> ( b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0)
c  in CNF:
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨  b^{39, 21}_2
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨  b^{39, 21}_1
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨  p_780 ∨ -b^{39, 21}_0
c  in DIMACS:
-16019  16020 -16021  780  16022 0
-16019  16020 -16021  780  16023 0
-16019  16020 -16021  780 -16024 0

c  -2-1 --> break 
c    ( b^{39, 20}_2 ∧  b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨  b^{39, 20}_0 ∨  p_780 ∨ break
c  in DIMACS:
-16019 -16020  16021  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 20}_2 ∧ -b^{39, 20}_1 ∧ -b^{39, 20}_0 ∧ true) 
c  in CNF:
c    -b^{39, 20}_2 ∨  b^{39, 20}_1 ∨  b^{39, 20}_0 ∨ false 
c  in DIMACS:
-16019  16020  16021  0

c  3 does not represent an automaton state.
c    -(-b^{39, 20}_2 ∧  b^{39, 20}_1 ∧  b^{39, 20}_0 ∧ true) 
c  in CNF:
c     b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ false 
c  in DIMACS:
 16019 -16020 -16021  0
c  -3 does not represent an automaton state.
c    -( b^{39, 20}_2 ∧  b^{39, 20}_1 ∧  b^{39, 20}_0 ∧ true) 
c  in CNF:
c    -b^{39, 20}_2 ∨ -b^{39, 20}_1 ∨ -b^{39, 20}_0 ∨ false 
c  in DIMACS:
-16019 -16020 -16021  0

c i = 21
c  -2+1 --> -1
c    ( b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧  p_819) -> ( b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0)
c  in CNF:
c    -b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨  b^{39, 22}_2
c    -b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_1
c    -b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨  b^{39, 22}_0
c  in DIMACS:
-16022 -16023  16024 -819  16025 0
-16022 -16023  16024 -819 -16026 0
-16022 -16023  16024 -819  16027 0

c  -1+1 --> 0
c    ( b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0 ∧  p_819) -> (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧ -b^{39, 22}_0)
c  in CNF:
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_2
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_1
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_0
c  in DIMACS:
-16022  16023 -16024 -819 -16025 0
-16022  16023 -16024 -819 -16026 0
-16022  16023 -16024 -819 -16027 0

c  0+1 --> 1
c    (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧  p_819) -> (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0)
c  in CNF:
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_2
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_1
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨  b^{39, 22}_0
c  in DIMACS:
 16022  16023  16024 -819 -16025 0
 16022  16023  16024 -819 -16026 0
 16022  16023  16024 -819  16027 0

c  1+1 --> 2
c    (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0 ∧  p_819) -> (-b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0)
c  in CNF:
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_2
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨  b^{39, 22}_1
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ -p_819 ∨ -b^{39, 22}_0
c  in DIMACS:
 16022  16023 -16024 -819 -16025 0
 16022  16023 -16024 -819  16026 0
 16022  16023 -16024 -819 -16027 0

c  2+1 --> break 
c    (-b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧  p_819) -> break
c  in CNF:
c     b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 16022 -16023  16024 -819 1162 0


c  2-1 --> 1
c    (-b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧ -p_819) -> (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0)
c  in CNF:
c     b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_2
c     b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_1
c     b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨  b^{39, 22}_0
c  in DIMACS:
 16022 -16023  16024  819 -16025 0
 16022 -16023  16024  819 -16026 0
 16022 -16023  16024  819  16027 0

c  1-1 --> 0
c    (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0 ∧ -p_819) -> (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧ -b^{39, 22}_0)
c  in CNF:
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_2
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_1
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_0
c  in DIMACS:
 16022  16023 -16024  819 -16025 0
 16022  16023 -16024  819 -16026 0
 16022  16023 -16024  819 -16027 0

c  0-1 --> -1
c    (-b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧ -p_819) -> ( b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0)
c  in CNF:
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨  b^{39, 22}_2
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_1
c     b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨  b^{39, 22}_0
c  in DIMACS:
 16022  16023  16024  819  16025 0
 16022  16023  16024  819 -16026 0
 16022  16023  16024  819  16027 0

c  -1-1 --> -2
c    ( b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧  b^{39, 21}_0 ∧ -p_819) -> ( b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0)
c  in CNF:
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨  b^{39, 22}_2
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨  b^{39, 22}_1
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨  p_819 ∨ -b^{39, 22}_0
c  in DIMACS:
-16022  16023 -16024  819  16025 0
-16022  16023 -16024  819  16026 0
-16022  16023 -16024  819 -16027 0

c  -2-1 --> break 
c    ( b^{39, 21}_2 ∧  b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨  b^{39, 21}_0 ∨  p_819 ∨ break
c  in DIMACS:
-16022 -16023  16024  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 21}_2 ∧ -b^{39, 21}_1 ∧ -b^{39, 21}_0 ∧ true) 
c  in CNF:
c    -b^{39, 21}_2 ∨  b^{39, 21}_1 ∨  b^{39, 21}_0 ∨ false 
c  in DIMACS:
-16022  16023  16024  0

c  3 does not represent an automaton state.
c    -(-b^{39, 21}_2 ∧  b^{39, 21}_1 ∧  b^{39, 21}_0 ∧ true) 
c  in CNF:
c     b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ false 
c  in DIMACS:
 16022 -16023 -16024  0
c  -3 does not represent an automaton state.
c    -( b^{39, 21}_2 ∧  b^{39, 21}_1 ∧  b^{39, 21}_0 ∧ true) 
c  in CNF:
c    -b^{39, 21}_2 ∨ -b^{39, 21}_1 ∨ -b^{39, 21}_0 ∨ false 
c  in DIMACS:
-16022 -16023 -16024  0

c i = 22
c  -2+1 --> -1
c    ( b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧  p_858) -> ( b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0)
c  in CNF:
c    -b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨  b^{39, 23}_2
c    -b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_1
c    -b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨  b^{39, 23}_0
c  in DIMACS:
-16025 -16026  16027 -858  16028 0
-16025 -16026  16027 -858 -16029 0
-16025 -16026  16027 -858  16030 0

c  -1+1 --> 0
c    ( b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0 ∧  p_858) -> (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧ -b^{39, 23}_0)
c  in CNF:
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_2
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_1
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_0
c  in DIMACS:
-16025  16026 -16027 -858 -16028 0
-16025  16026 -16027 -858 -16029 0
-16025  16026 -16027 -858 -16030 0

c  0+1 --> 1
c    (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧  p_858) -> (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0)
c  in CNF:
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_2
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_1
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨  b^{39, 23}_0
c  in DIMACS:
 16025  16026  16027 -858 -16028 0
 16025  16026  16027 -858 -16029 0
 16025  16026  16027 -858  16030 0

c  1+1 --> 2
c    (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0 ∧  p_858) -> (-b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0)
c  in CNF:
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_2
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨  b^{39, 23}_1
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ -p_858 ∨ -b^{39, 23}_0
c  in DIMACS:
 16025  16026 -16027 -858 -16028 0
 16025  16026 -16027 -858  16029 0
 16025  16026 -16027 -858 -16030 0

c  2+1 --> break 
c    (-b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧  p_858) -> break
c  in CNF:
c     b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 16025 -16026  16027 -858 1162 0


c  2-1 --> 1
c    (-b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧ -p_858) -> (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0)
c  in CNF:
c     b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_2
c     b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_1
c     b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨  b^{39, 23}_0
c  in DIMACS:
 16025 -16026  16027  858 -16028 0
 16025 -16026  16027  858 -16029 0
 16025 -16026  16027  858  16030 0

c  1-1 --> 0
c    (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0 ∧ -p_858) -> (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧ -b^{39, 23}_0)
c  in CNF:
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_2
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_1
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_0
c  in DIMACS:
 16025  16026 -16027  858 -16028 0
 16025  16026 -16027  858 -16029 0
 16025  16026 -16027  858 -16030 0

c  0-1 --> -1
c    (-b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧ -p_858) -> ( b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0)
c  in CNF:
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨  b^{39, 23}_2
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_1
c     b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨  b^{39, 23}_0
c  in DIMACS:
 16025  16026  16027  858  16028 0
 16025  16026  16027  858 -16029 0
 16025  16026  16027  858  16030 0

c  -1-1 --> -2
c    ( b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧  b^{39, 22}_0 ∧ -p_858) -> ( b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0)
c  in CNF:
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨  b^{39, 23}_2
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨  b^{39, 23}_1
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨  p_858 ∨ -b^{39, 23}_0
c  in DIMACS:
-16025  16026 -16027  858  16028 0
-16025  16026 -16027  858  16029 0
-16025  16026 -16027  858 -16030 0

c  -2-1 --> break 
c    ( b^{39, 22}_2 ∧  b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨  b^{39, 22}_0 ∨  p_858 ∨ break
c  in DIMACS:
-16025 -16026  16027  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 22}_2 ∧ -b^{39, 22}_1 ∧ -b^{39, 22}_0 ∧ true) 
c  in CNF:
c    -b^{39, 22}_2 ∨  b^{39, 22}_1 ∨  b^{39, 22}_0 ∨ false 
c  in DIMACS:
-16025  16026  16027  0

c  3 does not represent an automaton state.
c    -(-b^{39, 22}_2 ∧  b^{39, 22}_1 ∧  b^{39, 22}_0 ∧ true) 
c  in CNF:
c     b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ false 
c  in DIMACS:
 16025 -16026 -16027  0
c  -3 does not represent an automaton state.
c    -( b^{39, 22}_2 ∧  b^{39, 22}_1 ∧  b^{39, 22}_0 ∧ true) 
c  in CNF:
c    -b^{39, 22}_2 ∨ -b^{39, 22}_1 ∨ -b^{39, 22}_0 ∨ false 
c  in DIMACS:
-16025 -16026 -16027  0

c i = 23
c  -2+1 --> -1
c    ( b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧  p_897) -> ( b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0)
c  in CNF:
c    -b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨  b^{39, 24}_2
c    -b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_1
c    -b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨  b^{39, 24}_0
c  in DIMACS:
-16028 -16029  16030 -897  16031 0
-16028 -16029  16030 -897 -16032 0
-16028 -16029  16030 -897  16033 0

c  -1+1 --> 0
c    ( b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0 ∧  p_897) -> (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧ -b^{39, 24}_0)
c  in CNF:
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_2
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_1
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_0
c  in DIMACS:
-16028  16029 -16030 -897 -16031 0
-16028  16029 -16030 -897 -16032 0
-16028  16029 -16030 -897 -16033 0

c  0+1 --> 1
c    (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧  p_897) -> (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0)
c  in CNF:
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_2
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_1
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨  b^{39, 24}_0
c  in DIMACS:
 16028  16029  16030 -897 -16031 0
 16028  16029  16030 -897 -16032 0
 16028  16029  16030 -897  16033 0

c  1+1 --> 2
c    (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0 ∧  p_897) -> (-b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0)
c  in CNF:
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_2
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨  b^{39, 24}_1
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ -p_897 ∨ -b^{39, 24}_0
c  in DIMACS:
 16028  16029 -16030 -897 -16031 0
 16028  16029 -16030 -897  16032 0
 16028  16029 -16030 -897 -16033 0

c  2+1 --> break 
c    (-b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧  p_897) -> break
c  in CNF:
c     b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 16028 -16029  16030 -897 1162 0


c  2-1 --> 1
c    (-b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧ -p_897) -> (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0)
c  in CNF:
c     b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_2
c     b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_1
c     b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨  b^{39, 24}_0
c  in DIMACS:
 16028 -16029  16030  897 -16031 0
 16028 -16029  16030  897 -16032 0
 16028 -16029  16030  897  16033 0

c  1-1 --> 0
c    (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0 ∧ -p_897) -> (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧ -b^{39, 24}_0)
c  in CNF:
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_2
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_1
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_0
c  in DIMACS:
 16028  16029 -16030  897 -16031 0
 16028  16029 -16030  897 -16032 0
 16028  16029 -16030  897 -16033 0

c  0-1 --> -1
c    (-b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧ -p_897) -> ( b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0)
c  in CNF:
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨  b^{39, 24}_2
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_1
c     b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨  b^{39, 24}_0
c  in DIMACS:
 16028  16029  16030  897  16031 0
 16028  16029  16030  897 -16032 0
 16028  16029  16030  897  16033 0

c  -1-1 --> -2
c    ( b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧  b^{39, 23}_0 ∧ -p_897) -> ( b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0)
c  in CNF:
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨  b^{39, 24}_2
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨  b^{39, 24}_1
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨  p_897 ∨ -b^{39, 24}_0
c  in DIMACS:
-16028  16029 -16030  897  16031 0
-16028  16029 -16030  897  16032 0
-16028  16029 -16030  897 -16033 0

c  -2-1 --> break 
c    ( b^{39, 23}_2 ∧  b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨  b^{39, 23}_0 ∨  p_897 ∨ break
c  in DIMACS:
-16028 -16029  16030  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 23}_2 ∧ -b^{39, 23}_1 ∧ -b^{39, 23}_0 ∧ true) 
c  in CNF:
c    -b^{39, 23}_2 ∨  b^{39, 23}_1 ∨  b^{39, 23}_0 ∨ false 
c  in DIMACS:
-16028  16029  16030  0

c  3 does not represent an automaton state.
c    -(-b^{39, 23}_2 ∧  b^{39, 23}_1 ∧  b^{39, 23}_0 ∧ true) 
c  in CNF:
c     b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ false 
c  in DIMACS:
 16028 -16029 -16030  0
c  -3 does not represent an automaton state.
c    -( b^{39, 23}_2 ∧  b^{39, 23}_1 ∧  b^{39, 23}_0 ∧ true) 
c  in CNF:
c    -b^{39, 23}_2 ∨ -b^{39, 23}_1 ∨ -b^{39, 23}_0 ∨ false 
c  in DIMACS:
-16028 -16029 -16030  0

c i = 24
c  -2+1 --> -1
c    ( b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧  p_936) -> ( b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0)
c  in CNF:
c    -b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨  b^{39, 25}_2
c    -b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_1
c    -b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨  b^{39, 25}_0
c  in DIMACS:
-16031 -16032  16033 -936  16034 0
-16031 -16032  16033 -936 -16035 0
-16031 -16032  16033 -936  16036 0

c  -1+1 --> 0
c    ( b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0 ∧  p_936) -> (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧ -b^{39, 25}_0)
c  in CNF:
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_2
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_1
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_0
c  in DIMACS:
-16031  16032 -16033 -936 -16034 0
-16031  16032 -16033 -936 -16035 0
-16031  16032 -16033 -936 -16036 0

c  0+1 --> 1
c    (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧  p_936) -> (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0)
c  in CNF:
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_2
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_1
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨  b^{39, 25}_0
c  in DIMACS:
 16031  16032  16033 -936 -16034 0
 16031  16032  16033 -936 -16035 0
 16031  16032  16033 -936  16036 0

c  1+1 --> 2
c    (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0 ∧  p_936) -> (-b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0)
c  in CNF:
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_2
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨  b^{39, 25}_1
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ -p_936 ∨ -b^{39, 25}_0
c  in DIMACS:
 16031  16032 -16033 -936 -16034 0
 16031  16032 -16033 -936  16035 0
 16031  16032 -16033 -936 -16036 0

c  2+1 --> break 
c    (-b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧  p_936) -> break
c  in CNF:
c     b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 16031 -16032  16033 -936 1162 0


c  2-1 --> 1
c    (-b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧ -p_936) -> (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0)
c  in CNF:
c     b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_2
c     b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_1
c     b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨  b^{39, 25}_0
c  in DIMACS:
 16031 -16032  16033  936 -16034 0
 16031 -16032  16033  936 -16035 0
 16031 -16032  16033  936  16036 0

c  1-1 --> 0
c    (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0 ∧ -p_936) -> (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧ -b^{39, 25}_0)
c  in CNF:
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_2
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_1
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_0
c  in DIMACS:
 16031  16032 -16033  936 -16034 0
 16031  16032 -16033  936 -16035 0
 16031  16032 -16033  936 -16036 0

c  0-1 --> -1
c    (-b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧ -p_936) -> ( b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0)
c  in CNF:
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨  b^{39, 25}_2
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_1
c     b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨  b^{39, 25}_0
c  in DIMACS:
 16031  16032  16033  936  16034 0
 16031  16032  16033  936 -16035 0
 16031  16032  16033  936  16036 0

c  -1-1 --> -2
c    ( b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧  b^{39, 24}_0 ∧ -p_936) -> ( b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0)
c  in CNF:
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨  b^{39, 25}_2
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨  b^{39, 25}_1
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨  p_936 ∨ -b^{39, 25}_0
c  in DIMACS:
-16031  16032 -16033  936  16034 0
-16031  16032 -16033  936  16035 0
-16031  16032 -16033  936 -16036 0

c  -2-1 --> break 
c    ( b^{39, 24}_2 ∧  b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨  b^{39, 24}_0 ∨  p_936 ∨ break
c  in DIMACS:
-16031 -16032  16033  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 24}_2 ∧ -b^{39, 24}_1 ∧ -b^{39, 24}_0 ∧ true) 
c  in CNF:
c    -b^{39, 24}_2 ∨  b^{39, 24}_1 ∨  b^{39, 24}_0 ∨ false 
c  in DIMACS:
-16031  16032  16033  0

c  3 does not represent an automaton state.
c    -(-b^{39, 24}_2 ∧  b^{39, 24}_1 ∧  b^{39, 24}_0 ∧ true) 
c  in CNF:
c     b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ false 
c  in DIMACS:
 16031 -16032 -16033  0
c  -3 does not represent an automaton state.
c    -( b^{39, 24}_2 ∧  b^{39, 24}_1 ∧  b^{39, 24}_0 ∧ true) 
c  in CNF:
c    -b^{39, 24}_2 ∨ -b^{39, 24}_1 ∨ -b^{39, 24}_0 ∨ false 
c  in DIMACS:
-16031 -16032 -16033  0

c i = 25
c  -2+1 --> -1
c    ( b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧  p_975) -> ( b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0)
c  in CNF:
c    -b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨  b^{39, 26}_2
c    -b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_1
c    -b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨  b^{39, 26}_0
c  in DIMACS:
-16034 -16035  16036 -975  16037 0
-16034 -16035  16036 -975 -16038 0
-16034 -16035  16036 -975  16039 0

c  -1+1 --> 0
c    ( b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0 ∧  p_975) -> (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧ -b^{39, 26}_0)
c  in CNF:
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_2
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_1
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_0
c  in DIMACS:
-16034  16035 -16036 -975 -16037 0
-16034  16035 -16036 -975 -16038 0
-16034  16035 -16036 -975 -16039 0

c  0+1 --> 1
c    (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧  p_975) -> (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0)
c  in CNF:
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_2
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_1
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨  b^{39, 26}_0
c  in DIMACS:
 16034  16035  16036 -975 -16037 0
 16034  16035  16036 -975 -16038 0
 16034  16035  16036 -975  16039 0

c  1+1 --> 2
c    (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0 ∧  p_975) -> (-b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0)
c  in CNF:
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_2
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨  b^{39, 26}_1
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ -p_975 ∨ -b^{39, 26}_0
c  in DIMACS:
 16034  16035 -16036 -975 -16037 0
 16034  16035 -16036 -975  16038 0
 16034  16035 -16036 -975 -16039 0

c  2+1 --> break 
c    (-b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧  p_975) -> break
c  in CNF:
c     b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 16034 -16035  16036 -975 1162 0


c  2-1 --> 1
c    (-b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧ -p_975) -> (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0)
c  in CNF:
c     b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_2
c     b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_1
c     b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨  b^{39, 26}_0
c  in DIMACS:
 16034 -16035  16036  975 -16037 0
 16034 -16035  16036  975 -16038 0
 16034 -16035  16036  975  16039 0

c  1-1 --> 0
c    (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0 ∧ -p_975) -> (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧ -b^{39, 26}_0)
c  in CNF:
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_2
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_1
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_0
c  in DIMACS:
 16034  16035 -16036  975 -16037 0
 16034  16035 -16036  975 -16038 0
 16034  16035 -16036  975 -16039 0

c  0-1 --> -1
c    (-b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧ -p_975) -> ( b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0)
c  in CNF:
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨  b^{39, 26}_2
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_1
c     b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨  b^{39, 26}_0
c  in DIMACS:
 16034  16035  16036  975  16037 0
 16034  16035  16036  975 -16038 0
 16034  16035  16036  975  16039 0

c  -1-1 --> -2
c    ( b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧  b^{39, 25}_0 ∧ -p_975) -> ( b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0)
c  in CNF:
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨  b^{39, 26}_2
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨  b^{39, 26}_1
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨  p_975 ∨ -b^{39, 26}_0
c  in DIMACS:
-16034  16035 -16036  975  16037 0
-16034  16035 -16036  975  16038 0
-16034  16035 -16036  975 -16039 0

c  -2-1 --> break 
c    ( b^{39, 25}_2 ∧  b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨  b^{39, 25}_0 ∨  p_975 ∨ break
c  in DIMACS:
-16034 -16035  16036  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 25}_2 ∧ -b^{39, 25}_1 ∧ -b^{39, 25}_0 ∧ true) 
c  in CNF:
c    -b^{39, 25}_2 ∨  b^{39, 25}_1 ∨  b^{39, 25}_0 ∨ false 
c  in DIMACS:
-16034  16035  16036  0

c  3 does not represent an automaton state.
c    -(-b^{39, 25}_2 ∧  b^{39, 25}_1 ∧  b^{39, 25}_0 ∧ true) 
c  in CNF:
c     b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ false 
c  in DIMACS:
 16034 -16035 -16036  0
c  -3 does not represent an automaton state.
c    -( b^{39, 25}_2 ∧  b^{39, 25}_1 ∧  b^{39, 25}_0 ∧ true) 
c  in CNF:
c    -b^{39, 25}_2 ∨ -b^{39, 25}_1 ∨ -b^{39, 25}_0 ∨ false 
c  in DIMACS:
-16034 -16035 -16036  0

c i = 26
c  -2+1 --> -1
c    ( b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧  p_1014) -> ( b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0)
c  in CNF:
c    -b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨  b^{39, 27}_2
c    -b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_1
c    -b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨  b^{39, 27}_0
c  in DIMACS:
-16037 -16038  16039 -1014  16040 0
-16037 -16038  16039 -1014 -16041 0
-16037 -16038  16039 -1014  16042 0

c  -1+1 --> 0
c    ( b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0 ∧  p_1014) -> (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧ -b^{39, 27}_0)
c  in CNF:
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_2
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_1
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_0
c  in DIMACS:
-16037  16038 -16039 -1014 -16040 0
-16037  16038 -16039 -1014 -16041 0
-16037  16038 -16039 -1014 -16042 0

c  0+1 --> 1
c    (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧  p_1014) -> (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0)
c  in CNF:
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_2
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_1
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨  b^{39, 27}_0
c  in DIMACS:
 16037  16038  16039 -1014 -16040 0
 16037  16038  16039 -1014 -16041 0
 16037  16038  16039 -1014  16042 0

c  1+1 --> 2
c    (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0 ∧  p_1014) -> (-b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0)
c  in CNF:
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_2
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨  b^{39, 27}_1
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ -p_1014 ∨ -b^{39, 27}_0
c  in DIMACS:
 16037  16038 -16039 -1014 -16040 0
 16037  16038 -16039 -1014  16041 0
 16037  16038 -16039 -1014 -16042 0

c  2+1 --> break 
c    (-b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 16037 -16038  16039 -1014 1162 0


c  2-1 --> 1
c    (-b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧ -p_1014) -> (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0)
c  in CNF:
c     b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_2
c     b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_1
c     b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨  b^{39, 27}_0
c  in DIMACS:
 16037 -16038  16039  1014 -16040 0
 16037 -16038  16039  1014 -16041 0
 16037 -16038  16039  1014  16042 0

c  1-1 --> 0
c    (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0 ∧ -p_1014) -> (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧ -b^{39, 27}_0)
c  in CNF:
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_2
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_1
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_0
c  in DIMACS:
 16037  16038 -16039  1014 -16040 0
 16037  16038 -16039  1014 -16041 0
 16037  16038 -16039  1014 -16042 0

c  0-1 --> -1
c    (-b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧ -p_1014) -> ( b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0)
c  in CNF:
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨  b^{39, 27}_2
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_1
c     b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨  b^{39, 27}_0
c  in DIMACS:
 16037  16038  16039  1014  16040 0
 16037  16038  16039  1014 -16041 0
 16037  16038  16039  1014  16042 0

c  -1-1 --> -2
c    ( b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧  b^{39, 26}_0 ∧ -p_1014) -> ( b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0)
c  in CNF:
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨  b^{39, 27}_2
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨  b^{39, 27}_1
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨  p_1014 ∨ -b^{39, 27}_0
c  in DIMACS:
-16037  16038 -16039  1014  16040 0
-16037  16038 -16039  1014  16041 0
-16037  16038 -16039  1014 -16042 0

c  -2-1 --> break 
c    ( b^{39, 26}_2 ∧  b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨  b^{39, 26}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-16037 -16038  16039  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 26}_2 ∧ -b^{39, 26}_1 ∧ -b^{39, 26}_0 ∧ true) 
c  in CNF:
c    -b^{39, 26}_2 ∨  b^{39, 26}_1 ∨  b^{39, 26}_0 ∨ false 
c  in DIMACS:
-16037  16038  16039  0

c  3 does not represent an automaton state.
c    -(-b^{39, 26}_2 ∧  b^{39, 26}_1 ∧  b^{39, 26}_0 ∧ true) 
c  in CNF:
c     b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ false 
c  in DIMACS:
 16037 -16038 -16039  0
c  -3 does not represent an automaton state.
c    -( b^{39, 26}_2 ∧  b^{39, 26}_1 ∧  b^{39, 26}_0 ∧ true) 
c  in CNF:
c    -b^{39, 26}_2 ∨ -b^{39, 26}_1 ∨ -b^{39, 26}_0 ∨ false 
c  in DIMACS:
-16037 -16038 -16039  0

c i = 27
c  -2+1 --> -1
c    ( b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧  p_1053) -> ( b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0)
c  in CNF:
c    -b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨  b^{39, 28}_2
c    -b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_1
c    -b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨  b^{39, 28}_0
c  in DIMACS:
-16040 -16041  16042 -1053  16043 0
-16040 -16041  16042 -1053 -16044 0
-16040 -16041  16042 -1053  16045 0

c  -1+1 --> 0
c    ( b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0 ∧  p_1053) -> (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧ -b^{39, 28}_0)
c  in CNF:
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_2
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_1
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_0
c  in DIMACS:
-16040  16041 -16042 -1053 -16043 0
-16040  16041 -16042 -1053 -16044 0
-16040  16041 -16042 -1053 -16045 0

c  0+1 --> 1
c    (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧  p_1053) -> (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0)
c  in CNF:
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_2
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_1
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨  b^{39, 28}_0
c  in DIMACS:
 16040  16041  16042 -1053 -16043 0
 16040  16041  16042 -1053 -16044 0
 16040  16041  16042 -1053  16045 0

c  1+1 --> 2
c    (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0 ∧  p_1053) -> (-b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0)
c  in CNF:
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_2
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨  b^{39, 28}_1
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ -p_1053 ∨ -b^{39, 28}_0
c  in DIMACS:
 16040  16041 -16042 -1053 -16043 0
 16040  16041 -16042 -1053  16044 0
 16040  16041 -16042 -1053 -16045 0

c  2+1 --> break 
c    (-b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 16040 -16041  16042 -1053 1162 0


c  2-1 --> 1
c    (-b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧ -p_1053) -> (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0)
c  in CNF:
c     b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_2
c     b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_1
c     b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨  b^{39, 28}_0
c  in DIMACS:
 16040 -16041  16042  1053 -16043 0
 16040 -16041  16042  1053 -16044 0
 16040 -16041  16042  1053  16045 0

c  1-1 --> 0
c    (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0 ∧ -p_1053) -> (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧ -b^{39, 28}_0)
c  in CNF:
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_2
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_1
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_0
c  in DIMACS:
 16040  16041 -16042  1053 -16043 0
 16040  16041 -16042  1053 -16044 0
 16040  16041 -16042  1053 -16045 0

c  0-1 --> -1
c    (-b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧ -p_1053) -> ( b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0)
c  in CNF:
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨  b^{39, 28}_2
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_1
c     b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨  b^{39, 28}_0
c  in DIMACS:
 16040  16041  16042  1053  16043 0
 16040  16041  16042  1053 -16044 0
 16040  16041  16042  1053  16045 0

c  -1-1 --> -2
c    ( b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧  b^{39, 27}_0 ∧ -p_1053) -> ( b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0)
c  in CNF:
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨  b^{39, 28}_2
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨  b^{39, 28}_1
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨  p_1053 ∨ -b^{39, 28}_0
c  in DIMACS:
-16040  16041 -16042  1053  16043 0
-16040  16041 -16042  1053  16044 0
-16040  16041 -16042  1053 -16045 0

c  -2-1 --> break 
c    ( b^{39, 27}_2 ∧  b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨  b^{39, 27}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-16040 -16041  16042  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 27}_2 ∧ -b^{39, 27}_1 ∧ -b^{39, 27}_0 ∧ true) 
c  in CNF:
c    -b^{39, 27}_2 ∨  b^{39, 27}_1 ∨  b^{39, 27}_0 ∨ false 
c  in DIMACS:
-16040  16041  16042  0

c  3 does not represent an automaton state.
c    -(-b^{39, 27}_2 ∧  b^{39, 27}_1 ∧  b^{39, 27}_0 ∧ true) 
c  in CNF:
c     b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ false 
c  in DIMACS:
 16040 -16041 -16042  0
c  -3 does not represent an automaton state.
c    -( b^{39, 27}_2 ∧  b^{39, 27}_1 ∧  b^{39, 27}_0 ∧ true) 
c  in CNF:
c    -b^{39, 27}_2 ∨ -b^{39, 27}_1 ∨ -b^{39, 27}_0 ∨ false 
c  in DIMACS:
-16040 -16041 -16042  0

c i = 28
c  -2+1 --> -1
c    ( b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧  p_1092) -> ( b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0)
c  in CNF:
c    -b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨  b^{39, 29}_2
c    -b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_1
c    -b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨  b^{39, 29}_0
c  in DIMACS:
-16043 -16044  16045 -1092  16046 0
-16043 -16044  16045 -1092 -16047 0
-16043 -16044  16045 -1092  16048 0

c  -1+1 --> 0
c    ( b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0 ∧  p_1092) -> (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧ -b^{39, 29}_0)
c  in CNF:
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_2
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_1
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_0
c  in DIMACS:
-16043  16044 -16045 -1092 -16046 0
-16043  16044 -16045 -1092 -16047 0
-16043  16044 -16045 -1092 -16048 0

c  0+1 --> 1
c    (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧  p_1092) -> (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0)
c  in CNF:
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_2
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_1
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨  b^{39, 29}_0
c  in DIMACS:
 16043  16044  16045 -1092 -16046 0
 16043  16044  16045 -1092 -16047 0
 16043  16044  16045 -1092  16048 0

c  1+1 --> 2
c    (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0 ∧  p_1092) -> (-b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0)
c  in CNF:
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_2
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨  b^{39, 29}_1
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ -p_1092 ∨ -b^{39, 29}_0
c  in DIMACS:
 16043  16044 -16045 -1092 -16046 0
 16043  16044 -16045 -1092  16047 0
 16043  16044 -16045 -1092 -16048 0

c  2+1 --> break 
c    (-b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 16043 -16044  16045 -1092 1162 0


c  2-1 --> 1
c    (-b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧ -p_1092) -> (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0)
c  in CNF:
c     b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_2
c     b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_1
c     b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨  b^{39, 29}_0
c  in DIMACS:
 16043 -16044  16045  1092 -16046 0
 16043 -16044  16045  1092 -16047 0
 16043 -16044  16045  1092  16048 0

c  1-1 --> 0
c    (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0 ∧ -p_1092) -> (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧ -b^{39, 29}_0)
c  in CNF:
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_2
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_1
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_0
c  in DIMACS:
 16043  16044 -16045  1092 -16046 0
 16043  16044 -16045  1092 -16047 0
 16043  16044 -16045  1092 -16048 0

c  0-1 --> -1
c    (-b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧ -p_1092) -> ( b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0)
c  in CNF:
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨  b^{39, 29}_2
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_1
c     b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨  b^{39, 29}_0
c  in DIMACS:
 16043  16044  16045  1092  16046 0
 16043  16044  16045  1092 -16047 0
 16043  16044  16045  1092  16048 0

c  -1-1 --> -2
c    ( b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧  b^{39, 28}_0 ∧ -p_1092) -> ( b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0)
c  in CNF:
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨  b^{39, 29}_2
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨  b^{39, 29}_1
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨  p_1092 ∨ -b^{39, 29}_0
c  in DIMACS:
-16043  16044 -16045  1092  16046 0
-16043  16044 -16045  1092  16047 0
-16043  16044 -16045  1092 -16048 0

c  -2-1 --> break 
c    ( b^{39, 28}_2 ∧  b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨  b^{39, 28}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-16043 -16044  16045  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 28}_2 ∧ -b^{39, 28}_1 ∧ -b^{39, 28}_0 ∧ true) 
c  in CNF:
c    -b^{39, 28}_2 ∨  b^{39, 28}_1 ∨  b^{39, 28}_0 ∨ false 
c  in DIMACS:
-16043  16044  16045  0

c  3 does not represent an automaton state.
c    -(-b^{39, 28}_2 ∧  b^{39, 28}_1 ∧  b^{39, 28}_0 ∧ true) 
c  in CNF:
c     b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ false 
c  in DIMACS:
 16043 -16044 -16045  0
c  -3 does not represent an automaton state.
c    -( b^{39, 28}_2 ∧  b^{39, 28}_1 ∧  b^{39, 28}_0 ∧ true) 
c  in CNF:
c    -b^{39, 28}_2 ∨ -b^{39, 28}_1 ∨ -b^{39, 28}_0 ∨ false 
c  in DIMACS:
-16043 -16044 -16045  0

c i = 29
c  -2+1 --> -1
c    ( b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧  p_1131) -> ( b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧  b^{39, 30}_0)
c  in CNF:
c    -b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨  b^{39, 30}_2
c    -b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_1
c    -b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨  b^{39, 30}_0
c  in DIMACS:
-16046 -16047  16048 -1131  16049 0
-16046 -16047  16048 -1131 -16050 0
-16046 -16047  16048 -1131  16051 0

c  -1+1 --> 0
c    ( b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0 ∧  p_1131) -> (-b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧ -b^{39, 30}_0)
c  in CNF:
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_2
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_1
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_0
c  in DIMACS:
-16046  16047 -16048 -1131 -16049 0
-16046  16047 -16048 -1131 -16050 0
-16046  16047 -16048 -1131 -16051 0

c  0+1 --> 1
c    (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧  p_1131) -> (-b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧  b^{39, 30}_0)
c  in CNF:
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_2
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_1
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨  b^{39, 30}_0
c  in DIMACS:
 16046  16047  16048 -1131 -16049 0
 16046  16047  16048 -1131 -16050 0
 16046  16047  16048 -1131  16051 0

c  1+1 --> 2
c    (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0 ∧  p_1131) -> (-b^{39, 30}_2 ∧  b^{39, 30}_1 ∧ -b^{39, 30}_0)
c  in CNF:
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_2
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨  b^{39, 30}_1
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ -p_1131 ∨ -b^{39, 30}_0
c  in DIMACS:
 16046  16047 -16048 -1131 -16049 0
 16046  16047 -16048 -1131  16050 0
 16046  16047 -16048 -1131 -16051 0

c  2+1 --> break 
c    (-b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 16046 -16047  16048 -1131 1162 0


c  2-1 --> 1
c    (-b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧ -p_1131) -> (-b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧  b^{39, 30}_0)
c  in CNF:
c     b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_2
c     b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_1
c     b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨  b^{39, 30}_0
c  in DIMACS:
 16046 -16047  16048  1131 -16049 0
 16046 -16047  16048  1131 -16050 0
 16046 -16047  16048  1131  16051 0

c  1-1 --> 0
c    (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0 ∧ -p_1131) -> (-b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧ -b^{39, 30}_0)
c  in CNF:
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_2
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_1
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_0
c  in DIMACS:
 16046  16047 -16048  1131 -16049 0
 16046  16047 -16048  1131 -16050 0
 16046  16047 -16048  1131 -16051 0

c  0-1 --> -1
c    (-b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧ -p_1131) -> ( b^{39, 30}_2 ∧ -b^{39, 30}_1 ∧  b^{39, 30}_0)
c  in CNF:
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨  b^{39, 30}_2
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_1
c     b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨  b^{39, 30}_0
c  in DIMACS:
 16046  16047  16048  1131  16049 0
 16046  16047  16048  1131 -16050 0
 16046  16047  16048  1131  16051 0

c  -1-1 --> -2
c    ( b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧  b^{39, 29}_0 ∧ -p_1131) -> ( b^{39, 30}_2 ∧  b^{39, 30}_1 ∧ -b^{39, 30}_0)
c  in CNF:
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨  b^{39, 30}_2
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨  b^{39, 30}_1
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨  p_1131 ∨ -b^{39, 30}_0
c  in DIMACS:
-16046  16047 -16048  1131  16049 0
-16046  16047 -16048  1131  16050 0
-16046  16047 -16048  1131 -16051 0

c  -2-1 --> break 
c    ( b^{39, 29}_2 ∧  b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨  b^{39, 29}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-16046 -16047  16048  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{39, 29}_2 ∧ -b^{39, 29}_1 ∧ -b^{39, 29}_0 ∧ true) 
c  in CNF:
c    -b^{39, 29}_2 ∨  b^{39, 29}_1 ∨  b^{39, 29}_0 ∨ false 
c  in DIMACS:
-16046  16047  16048  0

c  3 does not represent an automaton state.
c    -(-b^{39, 29}_2 ∧  b^{39, 29}_1 ∧  b^{39, 29}_0 ∧ true) 
c  in CNF:
c     b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ false 
c  in DIMACS:
 16046 -16047 -16048  0
c  -3 does not represent an automaton state.
c    -( b^{39, 29}_2 ∧  b^{39, 29}_1 ∧  b^{39, 29}_0 ∧ true) 
c  in CNF:
c    -b^{39, 29}_2 ∨ -b^{39, 29}_1 ∨ -b^{39, 29}_0 ∨ false 
c  in DIMACS:
-16046 -16047 -16048  0

c INIT for k = 40
c    -b^{40, 1}_2
c    -b^{40, 1}_1
c    -b^{40, 1}_0
c  in DIMACS:
-16052 0
-16053 0
-16054 0

c Transitions for k = 40
c i = 1
c  -2+1 --> -1
c    ( b^{40, 1}_2 ∧  b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧  p_40) -> ( b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0)
c  in CNF:
c    -b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨  b^{40, 2}_2
c    -b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_1
c    -b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨  b^{40, 2}_0
c  in DIMACS:
-16052 -16053  16054 -40  16055 0
-16052 -16053  16054 -40 -16056 0
-16052 -16053  16054 -40  16057 0

c  -1+1 --> 0
c    ( b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧  b^{40, 1}_0 ∧  p_40) -> (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧ -b^{40, 2}_0)
c  in CNF:
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_2
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_1
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_0
c  in DIMACS:
-16052  16053 -16054 -40 -16055 0
-16052  16053 -16054 -40 -16056 0
-16052  16053 -16054 -40 -16057 0

c  0+1 --> 1
c    (-b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧  p_40) -> (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0)
c  in CNF:
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_2
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_1
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨  b^{40, 2}_0
c  in DIMACS:
 16052  16053  16054 -40 -16055 0
 16052  16053  16054 -40 -16056 0
 16052  16053  16054 -40  16057 0

c  1+1 --> 2
c    (-b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧  b^{40, 1}_0 ∧  p_40) -> (-b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0)
c  in CNF:
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_2
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨  b^{40, 2}_1
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ -p_40 ∨ -b^{40, 2}_0
c  in DIMACS:
 16052  16053 -16054 -40 -16055 0
 16052  16053 -16054 -40  16056 0
 16052  16053 -16054 -40 -16057 0

c  2+1 --> break 
c    (-b^{40, 1}_2 ∧  b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧  p_40) -> break
c  in CNF:
c     b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ -p_40 ∨ break
c  in DIMACS:
 16052 -16053  16054 -40 1162 0


c  2-1 --> 1
c    (-b^{40, 1}_2 ∧  b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧ -p_40) -> (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0)
c  in CNF:
c     b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_2
c     b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_1
c     b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨  b^{40, 2}_0
c  in DIMACS:
 16052 -16053  16054  40 -16055 0
 16052 -16053  16054  40 -16056 0
 16052 -16053  16054  40  16057 0

c  1-1 --> 0
c    (-b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧  b^{40, 1}_0 ∧ -p_40) -> (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧ -b^{40, 2}_0)
c  in CNF:
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_2
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_1
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_0
c  in DIMACS:
 16052  16053 -16054  40 -16055 0
 16052  16053 -16054  40 -16056 0
 16052  16053 -16054  40 -16057 0

c  0-1 --> -1
c    (-b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧ -p_40) -> ( b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0)
c  in CNF:
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨  b^{40, 2}_2
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_1
c     b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨  b^{40, 2}_0
c  in DIMACS:
 16052  16053  16054  40  16055 0
 16052  16053  16054  40 -16056 0
 16052  16053  16054  40  16057 0

c  -1-1 --> -2
c    ( b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧  b^{40, 1}_0 ∧ -p_40) -> ( b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0)
c  in CNF:
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨  b^{40, 2}_2
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨  b^{40, 2}_1
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨  p_40 ∨ -b^{40, 2}_0
c  in DIMACS:
-16052  16053 -16054  40  16055 0
-16052  16053 -16054  40  16056 0
-16052  16053 -16054  40 -16057 0

c  -2-1 --> break 
c    ( b^{40, 1}_2 ∧  b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧ -p_40) -> break
c  in CNF:
c    -b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨  b^{40, 1}_0 ∨  p_40 ∨ break
c  in DIMACS:
-16052 -16053  16054  40 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 1}_2 ∧ -b^{40, 1}_1 ∧ -b^{40, 1}_0 ∧ true) 
c  in CNF:
c    -b^{40, 1}_2 ∨  b^{40, 1}_1 ∨  b^{40, 1}_0 ∨ false 
c  in DIMACS:
-16052  16053  16054  0

c  3 does not represent an automaton state.
c    -(-b^{40, 1}_2 ∧  b^{40, 1}_1 ∧  b^{40, 1}_0 ∧ true) 
c  in CNF:
c     b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ false 
c  in DIMACS:
 16052 -16053 -16054  0
c  -3 does not represent an automaton state.
c    -( b^{40, 1}_2 ∧  b^{40, 1}_1 ∧  b^{40, 1}_0 ∧ true) 
c  in CNF:
c    -b^{40, 1}_2 ∨ -b^{40, 1}_1 ∨ -b^{40, 1}_0 ∨ false 
c  in DIMACS:
-16052 -16053 -16054  0

c i = 2
c  -2+1 --> -1
c    ( b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧  p_80) -> ( b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0)
c  in CNF:
c    -b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨  b^{40, 3}_2
c    -b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_1
c    -b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨  b^{40, 3}_0
c  in DIMACS:
-16055 -16056  16057 -80  16058 0
-16055 -16056  16057 -80 -16059 0
-16055 -16056  16057 -80  16060 0

c  -1+1 --> 0
c    ( b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0 ∧  p_80) -> (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧ -b^{40, 3}_0)
c  in CNF:
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_2
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_1
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_0
c  in DIMACS:
-16055  16056 -16057 -80 -16058 0
-16055  16056 -16057 -80 -16059 0
-16055  16056 -16057 -80 -16060 0

c  0+1 --> 1
c    (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧  p_80) -> (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0)
c  in CNF:
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_2
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_1
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨  b^{40, 3}_0
c  in DIMACS:
 16055  16056  16057 -80 -16058 0
 16055  16056  16057 -80 -16059 0
 16055  16056  16057 -80  16060 0

c  1+1 --> 2
c    (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0 ∧  p_80) -> (-b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0)
c  in CNF:
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_2
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨  b^{40, 3}_1
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ -p_80 ∨ -b^{40, 3}_0
c  in DIMACS:
 16055  16056 -16057 -80 -16058 0
 16055  16056 -16057 -80  16059 0
 16055  16056 -16057 -80 -16060 0

c  2+1 --> break 
c    (-b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧  p_80) -> break
c  in CNF:
c     b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 16055 -16056  16057 -80 1162 0


c  2-1 --> 1
c    (-b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧ -p_80) -> (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0)
c  in CNF:
c     b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_2
c     b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_1
c     b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨  b^{40, 3}_0
c  in DIMACS:
 16055 -16056  16057  80 -16058 0
 16055 -16056  16057  80 -16059 0
 16055 -16056  16057  80  16060 0

c  1-1 --> 0
c    (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0 ∧ -p_80) -> (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧ -b^{40, 3}_0)
c  in CNF:
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_2
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_1
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_0
c  in DIMACS:
 16055  16056 -16057  80 -16058 0
 16055  16056 -16057  80 -16059 0
 16055  16056 -16057  80 -16060 0

c  0-1 --> -1
c    (-b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧ -p_80) -> ( b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0)
c  in CNF:
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨  b^{40, 3}_2
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_1
c     b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨  b^{40, 3}_0
c  in DIMACS:
 16055  16056  16057  80  16058 0
 16055  16056  16057  80 -16059 0
 16055  16056  16057  80  16060 0

c  -1-1 --> -2
c    ( b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧  b^{40, 2}_0 ∧ -p_80) -> ( b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0)
c  in CNF:
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨  b^{40, 3}_2
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨  b^{40, 3}_1
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨  p_80 ∨ -b^{40, 3}_0
c  in DIMACS:
-16055  16056 -16057  80  16058 0
-16055  16056 -16057  80  16059 0
-16055  16056 -16057  80 -16060 0

c  -2-1 --> break 
c    ( b^{40, 2}_2 ∧  b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨  b^{40, 2}_0 ∨  p_80 ∨ break
c  in DIMACS:
-16055 -16056  16057  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 2}_2 ∧ -b^{40, 2}_1 ∧ -b^{40, 2}_0 ∧ true) 
c  in CNF:
c    -b^{40, 2}_2 ∨  b^{40, 2}_1 ∨  b^{40, 2}_0 ∨ false 
c  in DIMACS:
-16055  16056  16057  0

c  3 does not represent an automaton state.
c    -(-b^{40, 2}_2 ∧  b^{40, 2}_1 ∧  b^{40, 2}_0 ∧ true) 
c  in CNF:
c     b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ false 
c  in DIMACS:
 16055 -16056 -16057  0
c  -3 does not represent an automaton state.
c    -( b^{40, 2}_2 ∧  b^{40, 2}_1 ∧  b^{40, 2}_0 ∧ true) 
c  in CNF:
c    -b^{40, 2}_2 ∨ -b^{40, 2}_1 ∨ -b^{40, 2}_0 ∨ false 
c  in DIMACS:
-16055 -16056 -16057  0

c i = 3
c  -2+1 --> -1
c    ( b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧  p_120) -> ( b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0)
c  in CNF:
c    -b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨  b^{40, 4}_2
c    -b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_1
c    -b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨  b^{40, 4}_0
c  in DIMACS:
-16058 -16059  16060 -120  16061 0
-16058 -16059  16060 -120 -16062 0
-16058 -16059  16060 -120  16063 0

c  -1+1 --> 0
c    ( b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0 ∧  p_120) -> (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧ -b^{40, 4}_0)
c  in CNF:
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_2
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_1
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_0
c  in DIMACS:
-16058  16059 -16060 -120 -16061 0
-16058  16059 -16060 -120 -16062 0
-16058  16059 -16060 -120 -16063 0

c  0+1 --> 1
c    (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧  p_120) -> (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0)
c  in CNF:
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_2
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_1
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨  b^{40, 4}_0
c  in DIMACS:
 16058  16059  16060 -120 -16061 0
 16058  16059  16060 -120 -16062 0
 16058  16059  16060 -120  16063 0

c  1+1 --> 2
c    (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0 ∧  p_120) -> (-b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0)
c  in CNF:
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_2
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨  b^{40, 4}_1
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ -p_120 ∨ -b^{40, 4}_0
c  in DIMACS:
 16058  16059 -16060 -120 -16061 0
 16058  16059 -16060 -120  16062 0
 16058  16059 -16060 -120 -16063 0

c  2+1 --> break 
c    (-b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧  p_120) -> break
c  in CNF:
c     b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 16058 -16059  16060 -120 1162 0


c  2-1 --> 1
c    (-b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧ -p_120) -> (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0)
c  in CNF:
c     b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_2
c     b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_1
c     b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨  b^{40, 4}_0
c  in DIMACS:
 16058 -16059  16060  120 -16061 0
 16058 -16059  16060  120 -16062 0
 16058 -16059  16060  120  16063 0

c  1-1 --> 0
c    (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0 ∧ -p_120) -> (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧ -b^{40, 4}_0)
c  in CNF:
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_2
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_1
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_0
c  in DIMACS:
 16058  16059 -16060  120 -16061 0
 16058  16059 -16060  120 -16062 0
 16058  16059 -16060  120 -16063 0

c  0-1 --> -1
c    (-b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧ -p_120) -> ( b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0)
c  in CNF:
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨  b^{40, 4}_2
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_1
c     b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨  b^{40, 4}_0
c  in DIMACS:
 16058  16059  16060  120  16061 0
 16058  16059  16060  120 -16062 0
 16058  16059  16060  120  16063 0

c  -1-1 --> -2
c    ( b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧  b^{40, 3}_0 ∧ -p_120) -> ( b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0)
c  in CNF:
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨  b^{40, 4}_2
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨  b^{40, 4}_1
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨  p_120 ∨ -b^{40, 4}_0
c  in DIMACS:
-16058  16059 -16060  120  16061 0
-16058  16059 -16060  120  16062 0
-16058  16059 -16060  120 -16063 0

c  -2-1 --> break 
c    ( b^{40, 3}_2 ∧  b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨  b^{40, 3}_0 ∨  p_120 ∨ break
c  in DIMACS:
-16058 -16059  16060  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 3}_2 ∧ -b^{40, 3}_1 ∧ -b^{40, 3}_0 ∧ true) 
c  in CNF:
c    -b^{40, 3}_2 ∨  b^{40, 3}_1 ∨  b^{40, 3}_0 ∨ false 
c  in DIMACS:
-16058  16059  16060  0

c  3 does not represent an automaton state.
c    -(-b^{40, 3}_2 ∧  b^{40, 3}_1 ∧  b^{40, 3}_0 ∧ true) 
c  in CNF:
c     b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ false 
c  in DIMACS:
 16058 -16059 -16060  0
c  -3 does not represent an automaton state.
c    -( b^{40, 3}_2 ∧  b^{40, 3}_1 ∧  b^{40, 3}_0 ∧ true) 
c  in CNF:
c    -b^{40, 3}_2 ∨ -b^{40, 3}_1 ∨ -b^{40, 3}_0 ∨ false 
c  in DIMACS:
-16058 -16059 -16060  0

c i = 4
c  -2+1 --> -1
c    ( b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧  p_160) -> ( b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0)
c  in CNF:
c    -b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨  b^{40, 5}_2
c    -b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_1
c    -b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨  b^{40, 5}_0
c  in DIMACS:
-16061 -16062  16063 -160  16064 0
-16061 -16062  16063 -160 -16065 0
-16061 -16062  16063 -160  16066 0

c  -1+1 --> 0
c    ( b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0 ∧  p_160) -> (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧ -b^{40, 5}_0)
c  in CNF:
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_2
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_1
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_0
c  in DIMACS:
-16061  16062 -16063 -160 -16064 0
-16061  16062 -16063 -160 -16065 0
-16061  16062 -16063 -160 -16066 0

c  0+1 --> 1
c    (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧  p_160) -> (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0)
c  in CNF:
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_2
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_1
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨  b^{40, 5}_0
c  in DIMACS:
 16061  16062  16063 -160 -16064 0
 16061  16062  16063 -160 -16065 0
 16061  16062  16063 -160  16066 0

c  1+1 --> 2
c    (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0 ∧  p_160) -> (-b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0)
c  in CNF:
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_2
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨  b^{40, 5}_1
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ -p_160 ∨ -b^{40, 5}_0
c  in DIMACS:
 16061  16062 -16063 -160 -16064 0
 16061  16062 -16063 -160  16065 0
 16061  16062 -16063 -160 -16066 0

c  2+1 --> break 
c    (-b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧  p_160) -> break
c  in CNF:
c     b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 16061 -16062  16063 -160 1162 0


c  2-1 --> 1
c    (-b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧ -p_160) -> (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0)
c  in CNF:
c     b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_2
c     b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_1
c     b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨  b^{40, 5}_0
c  in DIMACS:
 16061 -16062  16063  160 -16064 0
 16061 -16062  16063  160 -16065 0
 16061 -16062  16063  160  16066 0

c  1-1 --> 0
c    (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0 ∧ -p_160) -> (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧ -b^{40, 5}_0)
c  in CNF:
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_2
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_1
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_0
c  in DIMACS:
 16061  16062 -16063  160 -16064 0
 16061  16062 -16063  160 -16065 0
 16061  16062 -16063  160 -16066 0

c  0-1 --> -1
c    (-b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧ -p_160) -> ( b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0)
c  in CNF:
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨  b^{40, 5}_2
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_1
c     b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨  b^{40, 5}_0
c  in DIMACS:
 16061  16062  16063  160  16064 0
 16061  16062  16063  160 -16065 0
 16061  16062  16063  160  16066 0

c  -1-1 --> -2
c    ( b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧  b^{40, 4}_0 ∧ -p_160) -> ( b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0)
c  in CNF:
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨  b^{40, 5}_2
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨  b^{40, 5}_1
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨  p_160 ∨ -b^{40, 5}_0
c  in DIMACS:
-16061  16062 -16063  160  16064 0
-16061  16062 -16063  160  16065 0
-16061  16062 -16063  160 -16066 0

c  -2-1 --> break 
c    ( b^{40, 4}_2 ∧  b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨  b^{40, 4}_0 ∨  p_160 ∨ break
c  in DIMACS:
-16061 -16062  16063  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 4}_2 ∧ -b^{40, 4}_1 ∧ -b^{40, 4}_0 ∧ true) 
c  in CNF:
c    -b^{40, 4}_2 ∨  b^{40, 4}_1 ∨  b^{40, 4}_0 ∨ false 
c  in DIMACS:
-16061  16062  16063  0

c  3 does not represent an automaton state.
c    -(-b^{40, 4}_2 ∧  b^{40, 4}_1 ∧  b^{40, 4}_0 ∧ true) 
c  in CNF:
c     b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ false 
c  in DIMACS:
 16061 -16062 -16063  0
c  -3 does not represent an automaton state.
c    -( b^{40, 4}_2 ∧  b^{40, 4}_1 ∧  b^{40, 4}_0 ∧ true) 
c  in CNF:
c    -b^{40, 4}_2 ∨ -b^{40, 4}_1 ∨ -b^{40, 4}_0 ∨ false 
c  in DIMACS:
-16061 -16062 -16063  0

c i = 5
c  -2+1 --> -1
c    ( b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧  p_200) -> ( b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0)
c  in CNF:
c    -b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨  b^{40, 6}_2
c    -b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_1
c    -b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨  b^{40, 6}_0
c  in DIMACS:
-16064 -16065  16066 -200  16067 0
-16064 -16065  16066 -200 -16068 0
-16064 -16065  16066 -200  16069 0

c  -1+1 --> 0
c    ( b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0 ∧  p_200) -> (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧ -b^{40, 6}_0)
c  in CNF:
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_2
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_1
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_0
c  in DIMACS:
-16064  16065 -16066 -200 -16067 0
-16064  16065 -16066 -200 -16068 0
-16064  16065 -16066 -200 -16069 0

c  0+1 --> 1
c    (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧  p_200) -> (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0)
c  in CNF:
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_2
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_1
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨  b^{40, 6}_0
c  in DIMACS:
 16064  16065  16066 -200 -16067 0
 16064  16065  16066 -200 -16068 0
 16064  16065  16066 -200  16069 0

c  1+1 --> 2
c    (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0 ∧  p_200) -> (-b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0)
c  in CNF:
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_2
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨  b^{40, 6}_1
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ -p_200 ∨ -b^{40, 6}_0
c  in DIMACS:
 16064  16065 -16066 -200 -16067 0
 16064  16065 -16066 -200  16068 0
 16064  16065 -16066 -200 -16069 0

c  2+1 --> break 
c    (-b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧  p_200) -> break
c  in CNF:
c     b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 16064 -16065  16066 -200 1162 0


c  2-1 --> 1
c    (-b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧ -p_200) -> (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0)
c  in CNF:
c     b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_2
c     b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_1
c     b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨  b^{40, 6}_0
c  in DIMACS:
 16064 -16065  16066  200 -16067 0
 16064 -16065  16066  200 -16068 0
 16064 -16065  16066  200  16069 0

c  1-1 --> 0
c    (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0 ∧ -p_200) -> (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧ -b^{40, 6}_0)
c  in CNF:
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_2
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_1
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_0
c  in DIMACS:
 16064  16065 -16066  200 -16067 0
 16064  16065 -16066  200 -16068 0
 16064  16065 -16066  200 -16069 0

c  0-1 --> -1
c    (-b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧ -p_200) -> ( b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0)
c  in CNF:
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨  b^{40, 6}_2
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_1
c     b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨  b^{40, 6}_0
c  in DIMACS:
 16064  16065  16066  200  16067 0
 16064  16065  16066  200 -16068 0
 16064  16065  16066  200  16069 0

c  -1-1 --> -2
c    ( b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧  b^{40, 5}_0 ∧ -p_200) -> ( b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0)
c  in CNF:
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨  b^{40, 6}_2
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨  b^{40, 6}_1
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨  p_200 ∨ -b^{40, 6}_0
c  in DIMACS:
-16064  16065 -16066  200  16067 0
-16064  16065 -16066  200  16068 0
-16064  16065 -16066  200 -16069 0

c  -2-1 --> break 
c    ( b^{40, 5}_2 ∧  b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨  b^{40, 5}_0 ∨  p_200 ∨ break
c  in DIMACS:
-16064 -16065  16066  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 5}_2 ∧ -b^{40, 5}_1 ∧ -b^{40, 5}_0 ∧ true) 
c  in CNF:
c    -b^{40, 5}_2 ∨  b^{40, 5}_1 ∨  b^{40, 5}_0 ∨ false 
c  in DIMACS:
-16064  16065  16066  0

c  3 does not represent an automaton state.
c    -(-b^{40, 5}_2 ∧  b^{40, 5}_1 ∧  b^{40, 5}_0 ∧ true) 
c  in CNF:
c     b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ false 
c  in DIMACS:
 16064 -16065 -16066  0
c  -3 does not represent an automaton state.
c    -( b^{40, 5}_2 ∧  b^{40, 5}_1 ∧  b^{40, 5}_0 ∧ true) 
c  in CNF:
c    -b^{40, 5}_2 ∨ -b^{40, 5}_1 ∨ -b^{40, 5}_0 ∨ false 
c  in DIMACS:
-16064 -16065 -16066  0

c i = 6
c  -2+1 --> -1
c    ( b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧  p_240) -> ( b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0)
c  in CNF:
c    -b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨  b^{40, 7}_2
c    -b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_1
c    -b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨  b^{40, 7}_0
c  in DIMACS:
-16067 -16068  16069 -240  16070 0
-16067 -16068  16069 -240 -16071 0
-16067 -16068  16069 -240  16072 0

c  -1+1 --> 0
c    ( b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0 ∧  p_240) -> (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧ -b^{40, 7}_0)
c  in CNF:
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_2
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_1
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_0
c  in DIMACS:
-16067  16068 -16069 -240 -16070 0
-16067  16068 -16069 -240 -16071 0
-16067  16068 -16069 -240 -16072 0

c  0+1 --> 1
c    (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧  p_240) -> (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0)
c  in CNF:
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_2
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_1
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨  b^{40, 7}_0
c  in DIMACS:
 16067  16068  16069 -240 -16070 0
 16067  16068  16069 -240 -16071 0
 16067  16068  16069 -240  16072 0

c  1+1 --> 2
c    (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0 ∧  p_240) -> (-b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0)
c  in CNF:
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_2
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨  b^{40, 7}_1
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ -p_240 ∨ -b^{40, 7}_0
c  in DIMACS:
 16067  16068 -16069 -240 -16070 0
 16067  16068 -16069 -240  16071 0
 16067  16068 -16069 -240 -16072 0

c  2+1 --> break 
c    (-b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧  p_240) -> break
c  in CNF:
c     b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 16067 -16068  16069 -240 1162 0


c  2-1 --> 1
c    (-b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧ -p_240) -> (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0)
c  in CNF:
c     b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_2
c     b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_1
c     b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨  b^{40, 7}_0
c  in DIMACS:
 16067 -16068  16069  240 -16070 0
 16067 -16068  16069  240 -16071 0
 16067 -16068  16069  240  16072 0

c  1-1 --> 0
c    (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0 ∧ -p_240) -> (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧ -b^{40, 7}_0)
c  in CNF:
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_2
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_1
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_0
c  in DIMACS:
 16067  16068 -16069  240 -16070 0
 16067  16068 -16069  240 -16071 0
 16067  16068 -16069  240 -16072 0

c  0-1 --> -1
c    (-b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧ -p_240) -> ( b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0)
c  in CNF:
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨  b^{40, 7}_2
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_1
c     b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨  b^{40, 7}_0
c  in DIMACS:
 16067  16068  16069  240  16070 0
 16067  16068  16069  240 -16071 0
 16067  16068  16069  240  16072 0

c  -1-1 --> -2
c    ( b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧  b^{40, 6}_0 ∧ -p_240) -> ( b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0)
c  in CNF:
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨  b^{40, 7}_2
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨  b^{40, 7}_1
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨  p_240 ∨ -b^{40, 7}_0
c  in DIMACS:
-16067  16068 -16069  240  16070 0
-16067  16068 -16069  240  16071 0
-16067  16068 -16069  240 -16072 0

c  -2-1 --> break 
c    ( b^{40, 6}_2 ∧  b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨  b^{40, 6}_0 ∨  p_240 ∨ break
c  in DIMACS:
-16067 -16068  16069  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 6}_2 ∧ -b^{40, 6}_1 ∧ -b^{40, 6}_0 ∧ true) 
c  in CNF:
c    -b^{40, 6}_2 ∨  b^{40, 6}_1 ∨  b^{40, 6}_0 ∨ false 
c  in DIMACS:
-16067  16068  16069  0

c  3 does not represent an automaton state.
c    -(-b^{40, 6}_2 ∧  b^{40, 6}_1 ∧  b^{40, 6}_0 ∧ true) 
c  in CNF:
c     b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ false 
c  in DIMACS:
 16067 -16068 -16069  0
c  -3 does not represent an automaton state.
c    -( b^{40, 6}_2 ∧  b^{40, 6}_1 ∧  b^{40, 6}_0 ∧ true) 
c  in CNF:
c    -b^{40, 6}_2 ∨ -b^{40, 6}_1 ∨ -b^{40, 6}_0 ∨ false 
c  in DIMACS:
-16067 -16068 -16069  0

c i = 7
c  -2+1 --> -1
c    ( b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧  p_280) -> ( b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0)
c  in CNF:
c    -b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨  b^{40, 8}_2
c    -b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_1
c    -b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨  b^{40, 8}_0
c  in DIMACS:
-16070 -16071  16072 -280  16073 0
-16070 -16071  16072 -280 -16074 0
-16070 -16071  16072 -280  16075 0

c  -1+1 --> 0
c    ( b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0 ∧  p_280) -> (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧ -b^{40, 8}_0)
c  in CNF:
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_2
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_1
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_0
c  in DIMACS:
-16070  16071 -16072 -280 -16073 0
-16070  16071 -16072 -280 -16074 0
-16070  16071 -16072 -280 -16075 0

c  0+1 --> 1
c    (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧  p_280) -> (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0)
c  in CNF:
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_2
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_1
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨  b^{40, 8}_0
c  in DIMACS:
 16070  16071  16072 -280 -16073 0
 16070  16071  16072 -280 -16074 0
 16070  16071  16072 -280  16075 0

c  1+1 --> 2
c    (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0 ∧  p_280) -> (-b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0)
c  in CNF:
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_2
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨  b^{40, 8}_1
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ -p_280 ∨ -b^{40, 8}_0
c  in DIMACS:
 16070  16071 -16072 -280 -16073 0
 16070  16071 -16072 -280  16074 0
 16070  16071 -16072 -280 -16075 0

c  2+1 --> break 
c    (-b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧  p_280) -> break
c  in CNF:
c     b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 16070 -16071  16072 -280 1162 0


c  2-1 --> 1
c    (-b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧ -p_280) -> (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0)
c  in CNF:
c     b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_2
c     b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_1
c     b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨  b^{40, 8}_0
c  in DIMACS:
 16070 -16071  16072  280 -16073 0
 16070 -16071  16072  280 -16074 0
 16070 -16071  16072  280  16075 0

c  1-1 --> 0
c    (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0 ∧ -p_280) -> (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧ -b^{40, 8}_0)
c  in CNF:
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_2
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_1
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_0
c  in DIMACS:
 16070  16071 -16072  280 -16073 0
 16070  16071 -16072  280 -16074 0
 16070  16071 -16072  280 -16075 0

c  0-1 --> -1
c    (-b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧ -p_280) -> ( b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0)
c  in CNF:
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨  b^{40, 8}_2
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_1
c     b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨  b^{40, 8}_0
c  in DIMACS:
 16070  16071  16072  280  16073 0
 16070  16071  16072  280 -16074 0
 16070  16071  16072  280  16075 0

c  -1-1 --> -2
c    ( b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧  b^{40, 7}_0 ∧ -p_280) -> ( b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0)
c  in CNF:
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨  b^{40, 8}_2
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨  b^{40, 8}_1
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨  p_280 ∨ -b^{40, 8}_0
c  in DIMACS:
-16070  16071 -16072  280  16073 0
-16070  16071 -16072  280  16074 0
-16070  16071 -16072  280 -16075 0

c  -2-1 --> break 
c    ( b^{40, 7}_2 ∧  b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨  b^{40, 7}_0 ∨  p_280 ∨ break
c  in DIMACS:
-16070 -16071  16072  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 7}_2 ∧ -b^{40, 7}_1 ∧ -b^{40, 7}_0 ∧ true) 
c  in CNF:
c    -b^{40, 7}_2 ∨  b^{40, 7}_1 ∨  b^{40, 7}_0 ∨ false 
c  in DIMACS:
-16070  16071  16072  0

c  3 does not represent an automaton state.
c    -(-b^{40, 7}_2 ∧  b^{40, 7}_1 ∧  b^{40, 7}_0 ∧ true) 
c  in CNF:
c     b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ false 
c  in DIMACS:
 16070 -16071 -16072  0
c  -3 does not represent an automaton state.
c    -( b^{40, 7}_2 ∧  b^{40, 7}_1 ∧  b^{40, 7}_0 ∧ true) 
c  in CNF:
c    -b^{40, 7}_2 ∨ -b^{40, 7}_1 ∨ -b^{40, 7}_0 ∨ false 
c  in DIMACS:
-16070 -16071 -16072  0

c i = 8
c  -2+1 --> -1
c    ( b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧  p_320) -> ( b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0)
c  in CNF:
c    -b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨  b^{40, 9}_2
c    -b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_1
c    -b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨  b^{40, 9}_0
c  in DIMACS:
-16073 -16074  16075 -320  16076 0
-16073 -16074  16075 -320 -16077 0
-16073 -16074  16075 -320  16078 0

c  -1+1 --> 0
c    ( b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0 ∧  p_320) -> (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧ -b^{40, 9}_0)
c  in CNF:
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_2
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_1
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_0
c  in DIMACS:
-16073  16074 -16075 -320 -16076 0
-16073  16074 -16075 -320 -16077 0
-16073  16074 -16075 -320 -16078 0

c  0+1 --> 1
c    (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧  p_320) -> (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0)
c  in CNF:
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_2
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_1
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨  b^{40, 9}_0
c  in DIMACS:
 16073  16074  16075 -320 -16076 0
 16073  16074  16075 -320 -16077 0
 16073  16074  16075 -320  16078 0

c  1+1 --> 2
c    (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0 ∧  p_320) -> (-b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0)
c  in CNF:
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_2
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨  b^{40, 9}_1
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ -p_320 ∨ -b^{40, 9}_0
c  in DIMACS:
 16073  16074 -16075 -320 -16076 0
 16073  16074 -16075 -320  16077 0
 16073  16074 -16075 -320 -16078 0

c  2+1 --> break 
c    (-b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧  p_320) -> break
c  in CNF:
c     b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 16073 -16074  16075 -320 1162 0


c  2-1 --> 1
c    (-b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧ -p_320) -> (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0)
c  in CNF:
c     b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_2
c     b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_1
c     b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨  b^{40, 9}_0
c  in DIMACS:
 16073 -16074  16075  320 -16076 0
 16073 -16074  16075  320 -16077 0
 16073 -16074  16075  320  16078 0

c  1-1 --> 0
c    (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0 ∧ -p_320) -> (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧ -b^{40, 9}_0)
c  in CNF:
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_2
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_1
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_0
c  in DIMACS:
 16073  16074 -16075  320 -16076 0
 16073  16074 -16075  320 -16077 0
 16073  16074 -16075  320 -16078 0

c  0-1 --> -1
c    (-b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧ -p_320) -> ( b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0)
c  in CNF:
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨  b^{40, 9}_2
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_1
c     b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨  b^{40, 9}_0
c  in DIMACS:
 16073  16074  16075  320  16076 0
 16073  16074  16075  320 -16077 0
 16073  16074  16075  320  16078 0

c  -1-1 --> -2
c    ( b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧  b^{40, 8}_0 ∧ -p_320) -> ( b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0)
c  in CNF:
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨  b^{40, 9}_2
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨  b^{40, 9}_1
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨  p_320 ∨ -b^{40, 9}_0
c  in DIMACS:
-16073  16074 -16075  320  16076 0
-16073  16074 -16075  320  16077 0
-16073  16074 -16075  320 -16078 0

c  -2-1 --> break 
c    ( b^{40, 8}_2 ∧  b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨  b^{40, 8}_0 ∨  p_320 ∨ break
c  in DIMACS:
-16073 -16074  16075  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 8}_2 ∧ -b^{40, 8}_1 ∧ -b^{40, 8}_0 ∧ true) 
c  in CNF:
c    -b^{40, 8}_2 ∨  b^{40, 8}_1 ∨  b^{40, 8}_0 ∨ false 
c  in DIMACS:
-16073  16074  16075  0

c  3 does not represent an automaton state.
c    -(-b^{40, 8}_2 ∧  b^{40, 8}_1 ∧  b^{40, 8}_0 ∧ true) 
c  in CNF:
c     b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ false 
c  in DIMACS:
 16073 -16074 -16075  0
c  -3 does not represent an automaton state.
c    -( b^{40, 8}_2 ∧  b^{40, 8}_1 ∧  b^{40, 8}_0 ∧ true) 
c  in CNF:
c    -b^{40, 8}_2 ∨ -b^{40, 8}_1 ∨ -b^{40, 8}_0 ∨ false 
c  in DIMACS:
-16073 -16074 -16075  0

c i = 9
c  -2+1 --> -1
c    ( b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧  p_360) -> ( b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0)
c  in CNF:
c    -b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨  b^{40, 10}_2
c    -b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_1
c    -b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨  b^{40, 10}_0
c  in DIMACS:
-16076 -16077  16078 -360  16079 0
-16076 -16077  16078 -360 -16080 0
-16076 -16077  16078 -360  16081 0

c  -1+1 --> 0
c    ( b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0 ∧  p_360) -> (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧ -b^{40, 10}_0)
c  in CNF:
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_2
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_1
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_0
c  in DIMACS:
-16076  16077 -16078 -360 -16079 0
-16076  16077 -16078 -360 -16080 0
-16076  16077 -16078 -360 -16081 0

c  0+1 --> 1
c    (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧  p_360) -> (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0)
c  in CNF:
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_2
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_1
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨  b^{40, 10}_0
c  in DIMACS:
 16076  16077  16078 -360 -16079 0
 16076  16077  16078 -360 -16080 0
 16076  16077  16078 -360  16081 0

c  1+1 --> 2
c    (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0 ∧  p_360) -> (-b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0)
c  in CNF:
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_2
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨  b^{40, 10}_1
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ -p_360 ∨ -b^{40, 10}_0
c  in DIMACS:
 16076  16077 -16078 -360 -16079 0
 16076  16077 -16078 -360  16080 0
 16076  16077 -16078 -360 -16081 0

c  2+1 --> break 
c    (-b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧  p_360) -> break
c  in CNF:
c     b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 16076 -16077  16078 -360 1162 0


c  2-1 --> 1
c    (-b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧ -p_360) -> (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0)
c  in CNF:
c     b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_2
c     b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_1
c     b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨  b^{40, 10}_0
c  in DIMACS:
 16076 -16077  16078  360 -16079 0
 16076 -16077  16078  360 -16080 0
 16076 -16077  16078  360  16081 0

c  1-1 --> 0
c    (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0 ∧ -p_360) -> (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧ -b^{40, 10}_0)
c  in CNF:
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_2
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_1
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_0
c  in DIMACS:
 16076  16077 -16078  360 -16079 0
 16076  16077 -16078  360 -16080 0
 16076  16077 -16078  360 -16081 0

c  0-1 --> -1
c    (-b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧ -p_360) -> ( b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0)
c  in CNF:
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨  b^{40, 10}_2
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_1
c     b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨  b^{40, 10}_0
c  in DIMACS:
 16076  16077  16078  360  16079 0
 16076  16077  16078  360 -16080 0
 16076  16077  16078  360  16081 0

c  -1-1 --> -2
c    ( b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧  b^{40, 9}_0 ∧ -p_360) -> ( b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0)
c  in CNF:
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨  b^{40, 10}_2
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨  b^{40, 10}_1
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨  p_360 ∨ -b^{40, 10}_0
c  in DIMACS:
-16076  16077 -16078  360  16079 0
-16076  16077 -16078  360  16080 0
-16076  16077 -16078  360 -16081 0

c  -2-1 --> break 
c    ( b^{40, 9}_2 ∧  b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨  b^{40, 9}_0 ∨  p_360 ∨ break
c  in DIMACS:
-16076 -16077  16078  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 9}_2 ∧ -b^{40, 9}_1 ∧ -b^{40, 9}_0 ∧ true) 
c  in CNF:
c    -b^{40, 9}_2 ∨  b^{40, 9}_1 ∨  b^{40, 9}_0 ∨ false 
c  in DIMACS:
-16076  16077  16078  0

c  3 does not represent an automaton state.
c    -(-b^{40, 9}_2 ∧  b^{40, 9}_1 ∧  b^{40, 9}_0 ∧ true) 
c  in CNF:
c     b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ false 
c  in DIMACS:
 16076 -16077 -16078  0
c  -3 does not represent an automaton state.
c    -( b^{40, 9}_2 ∧  b^{40, 9}_1 ∧  b^{40, 9}_0 ∧ true) 
c  in CNF:
c    -b^{40, 9}_2 ∨ -b^{40, 9}_1 ∨ -b^{40, 9}_0 ∨ false 
c  in DIMACS:
-16076 -16077 -16078  0

c i = 10
c  -2+1 --> -1
c    ( b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧  p_400) -> ( b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0)
c  in CNF:
c    -b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨  b^{40, 11}_2
c    -b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_1
c    -b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨  b^{40, 11}_0
c  in DIMACS:
-16079 -16080  16081 -400  16082 0
-16079 -16080  16081 -400 -16083 0
-16079 -16080  16081 -400  16084 0

c  -1+1 --> 0
c    ( b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0 ∧  p_400) -> (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧ -b^{40, 11}_0)
c  in CNF:
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_2
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_1
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_0
c  in DIMACS:
-16079  16080 -16081 -400 -16082 0
-16079  16080 -16081 -400 -16083 0
-16079  16080 -16081 -400 -16084 0

c  0+1 --> 1
c    (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧  p_400) -> (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0)
c  in CNF:
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_2
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_1
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨  b^{40, 11}_0
c  in DIMACS:
 16079  16080  16081 -400 -16082 0
 16079  16080  16081 -400 -16083 0
 16079  16080  16081 -400  16084 0

c  1+1 --> 2
c    (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0 ∧  p_400) -> (-b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0)
c  in CNF:
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_2
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨  b^{40, 11}_1
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ -p_400 ∨ -b^{40, 11}_0
c  in DIMACS:
 16079  16080 -16081 -400 -16082 0
 16079  16080 -16081 -400  16083 0
 16079  16080 -16081 -400 -16084 0

c  2+1 --> break 
c    (-b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧  p_400) -> break
c  in CNF:
c     b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 16079 -16080  16081 -400 1162 0


c  2-1 --> 1
c    (-b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧ -p_400) -> (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0)
c  in CNF:
c     b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_2
c     b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_1
c     b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨  b^{40, 11}_0
c  in DIMACS:
 16079 -16080  16081  400 -16082 0
 16079 -16080  16081  400 -16083 0
 16079 -16080  16081  400  16084 0

c  1-1 --> 0
c    (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0 ∧ -p_400) -> (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧ -b^{40, 11}_0)
c  in CNF:
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_2
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_1
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_0
c  in DIMACS:
 16079  16080 -16081  400 -16082 0
 16079  16080 -16081  400 -16083 0
 16079  16080 -16081  400 -16084 0

c  0-1 --> -1
c    (-b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧ -p_400) -> ( b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0)
c  in CNF:
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨  b^{40, 11}_2
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_1
c     b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨  b^{40, 11}_0
c  in DIMACS:
 16079  16080  16081  400  16082 0
 16079  16080  16081  400 -16083 0
 16079  16080  16081  400  16084 0

c  -1-1 --> -2
c    ( b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧  b^{40, 10}_0 ∧ -p_400) -> ( b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0)
c  in CNF:
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨  b^{40, 11}_2
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨  b^{40, 11}_1
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨  p_400 ∨ -b^{40, 11}_0
c  in DIMACS:
-16079  16080 -16081  400  16082 0
-16079  16080 -16081  400  16083 0
-16079  16080 -16081  400 -16084 0

c  -2-1 --> break 
c    ( b^{40, 10}_2 ∧  b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨  b^{40, 10}_0 ∨  p_400 ∨ break
c  in DIMACS:
-16079 -16080  16081  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 10}_2 ∧ -b^{40, 10}_1 ∧ -b^{40, 10}_0 ∧ true) 
c  in CNF:
c    -b^{40, 10}_2 ∨  b^{40, 10}_1 ∨  b^{40, 10}_0 ∨ false 
c  in DIMACS:
-16079  16080  16081  0

c  3 does not represent an automaton state.
c    -(-b^{40, 10}_2 ∧  b^{40, 10}_1 ∧  b^{40, 10}_0 ∧ true) 
c  in CNF:
c     b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ false 
c  in DIMACS:
 16079 -16080 -16081  0
c  -3 does not represent an automaton state.
c    -( b^{40, 10}_2 ∧  b^{40, 10}_1 ∧  b^{40, 10}_0 ∧ true) 
c  in CNF:
c    -b^{40, 10}_2 ∨ -b^{40, 10}_1 ∨ -b^{40, 10}_0 ∨ false 
c  in DIMACS:
-16079 -16080 -16081  0

c i = 11
c  -2+1 --> -1
c    ( b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧  p_440) -> ( b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0)
c  in CNF:
c    -b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨  b^{40, 12}_2
c    -b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_1
c    -b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨  b^{40, 12}_0
c  in DIMACS:
-16082 -16083  16084 -440  16085 0
-16082 -16083  16084 -440 -16086 0
-16082 -16083  16084 -440  16087 0

c  -1+1 --> 0
c    ( b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0 ∧  p_440) -> (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧ -b^{40, 12}_0)
c  in CNF:
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_2
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_1
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_0
c  in DIMACS:
-16082  16083 -16084 -440 -16085 0
-16082  16083 -16084 -440 -16086 0
-16082  16083 -16084 -440 -16087 0

c  0+1 --> 1
c    (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧  p_440) -> (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0)
c  in CNF:
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_2
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_1
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨  b^{40, 12}_0
c  in DIMACS:
 16082  16083  16084 -440 -16085 0
 16082  16083  16084 -440 -16086 0
 16082  16083  16084 -440  16087 0

c  1+1 --> 2
c    (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0 ∧  p_440) -> (-b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0)
c  in CNF:
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_2
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨  b^{40, 12}_1
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ -p_440 ∨ -b^{40, 12}_0
c  in DIMACS:
 16082  16083 -16084 -440 -16085 0
 16082  16083 -16084 -440  16086 0
 16082  16083 -16084 -440 -16087 0

c  2+1 --> break 
c    (-b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧  p_440) -> break
c  in CNF:
c     b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 16082 -16083  16084 -440 1162 0


c  2-1 --> 1
c    (-b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧ -p_440) -> (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0)
c  in CNF:
c     b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_2
c     b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_1
c     b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨  b^{40, 12}_0
c  in DIMACS:
 16082 -16083  16084  440 -16085 0
 16082 -16083  16084  440 -16086 0
 16082 -16083  16084  440  16087 0

c  1-1 --> 0
c    (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0 ∧ -p_440) -> (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧ -b^{40, 12}_0)
c  in CNF:
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_2
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_1
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_0
c  in DIMACS:
 16082  16083 -16084  440 -16085 0
 16082  16083 -16084  440 -16086 0
 16082  16083 -16084  440 -16087 0

c  0-1 --> -1
c    (-b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧ -p_440) -> ( b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0)
c  in CNF:
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨  b^{40, 12}_2
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_1
c     b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨  b^{40, 12}_0
c  in DIMACS:
 16082  16083  16084  440  16085 0
 16082  16083  16084  440 -16086 0
 16082  16083  16084  440  16087 0

c  -1-1 --> -2
c    ( b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧  b^{40, 11}_0 ∧ -p_440) -> ( b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0)
c  in CNF:
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨  b^{40, 12}_2
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨  b^{40, 12}_1
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨  p_440 ∨ -b^{40, 12}_0
c  in DIMACS:
-16082  16083 -16084  440  16085 0
-16082  16083 -16084  440  16086 0
-16082  16083 -16084  440 -16087 0

c  -2-1 --> break 
c    ( b^{40, 11}_2 ∧  b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨  b^{40, 11}_0 ∨  p_440 ∨ break
c  in DIMACS:
-16082 -16083  16084  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 11}_2 ∧ -b^{40, 11}_1 ∧ -b^{40, 11}_0 ∧ true) 
c  in CNF:
c    -b^{40, 11}_2 ∨  b^{40, 11}_1 ∨  b^{40, 11}_0 ∨ false 
c  in DIMACS:
-16082  16083  16084  0

c  3 does not represent an automaton state.
c    -(-b^{40, 11}_2 ∧  b^{40, 11}_1 ∧  b^{40, 11}_0 ∧ true) 
c  in CNF:
c     b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ false 
c  in DIMACS:
 16082 -16083 -16084  0
c  -3 does not represent an automaton state.
c    -( b^{40, 11}_2 ∧  b^{40, 11}_1 ∧  b^{40, 11}_0 ∧ true) 
c  in CNF:
c    -b^{40, 11}_2 ∨ -b^{40, 11}_1 ∨ -b^{40, 11}_0 ∨ false 
c  in DIMACS:
-16082 -16083 -16084  0

c i = 12
c  -2+1 --> -1
c    ( b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧  p_480) -> ( b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0)
c  in CNF:
c    -b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨  b^{40, 13}_2
c    -b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_1
c    -b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨  b^{40, 13}_0
c  in DIMACS:
-16085 -16086  16087 -480  16088 0
-16085 -16086  16087 -480 -16089 0
-16085 -16086  16087 -480  16090 0

c  -1+1 --> 0
c    ( b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0 ∧  p_480) -> (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧ -b^{40, 13}_0)
c  in CNF:
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_2
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_1
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_0
c  in DIMACS:
-16085  16086 -16087 -480 -16088 0
-16085  16086 -16087 -480 -16089 0
-16085  16086 -16087 -480 -16090 0

c  0+1 --> 1
c    (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧  p_480) -> (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0)
c  in CNF:
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_2
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_1
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨  b^{40, 13}_0
c  in DIMACS:
 16085  16086  16087 -480 -16088 0
 16085  16086  16087 -480 -16089 0
 16085  16086  16087 -480  16090 0

c  1+1 --> 2
c    (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0 ∧  p_480) -> (-b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0)
c  in CNF:
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_2
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨  b^{40, 13}_1
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ -p_480 ∨ -b^{40, 13}_0
c  in DIMACS:
 16085  16086 -16087 -480 -16088 0
 16085  16086 -16087 -480  16089 0
 16085  16086 -16087 -480 -16090 0

c  2+1 --> break 
c    (-b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧  p_480) -> break
c  in CNF:
c     b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 16085 -16086  16087 -480 1162 0


c  2-1 --> 1
c    (-b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧ -p_480) -> (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0)
c  in CNF:
c     b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_2
c     b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_1
c     b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨  b^{40, 13}_0
c  in DIMACS:
 16085 -16086  16087  480 -16088 0
 16085 -16086  16087  480 -16089 0
 16085 -16086  16087  480  16090 0

c  1-1 --> 0
c    (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0 ∧ -p_480) -> (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧ -b^{40, 13}_0)
c  in CNF:
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_2
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_1
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_0
c  in DIMACS:
 16085  16086 -16087  480 -16088 0
 16085  16086 -16087  480 -16089 0
 16085  16086 -16087  480 -16090 0

c  0-1 --> -1
c    (-b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧ -p_480) -> ( b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0)
c  in CNF:
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨  b^{40, 13}_2
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_1
c     b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨  b^{40, 13}_0
c  in DIMACS:
 16085  16086  16087  480  16088 0
 16085  16086  16087  480 -16089 0
 16085  16086  16087  480  16090 0

c  -1-1 --> -2
c    ( b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧  b^{40, 12}_0 ∧ -p_480) -> ( b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0)
c  in CNF:
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨  b^{40, 13}_2
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨  b^{40, 13}_1
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨  p_480 ∨ -b^{40, 13}_0
c  in DIMACS:
-16085  16086 -16087  480  16088 0
-16085  16086 -16087  480  16089 0
-16085  16086 -16087  480 -16090 0

c  -2-1 --> break 
c    ( b^{40, 12}_2 ∧  b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨  b^{40, 12}_0 ∨  p_480 ∨ break
c  in DIMACS:
-16085 -16086  16087  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 12}_2 ∧ -b^{40, 12}_1 ∧ -b^{40, 12}_0 ∧ true) 
c  in CNF:
c    -b^{40, 12}_2 ∨  b^{40, 12}_1 ∨  b^{40, 12}_0 ∨ false 
c  in DIMACS:
-16085  16086  16087  0

c  3 does not represent an automaton state.
c    -(-b^{40, 12}_2 ∧  b^{40, 12}_1 ∧  b^{40, 12}_0 ∧ true) 
c  in CNF:
c     b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ false 
c  in DIMACS:
 16085 -16086 -16087  0
c  -3 does not represent an automaton state.
c    -( b^{40, 12}_2 ∧  b^{40, 12}_1 ∧  b^{40, 12}_0 ∧ true) 
c  in CNF:
c    -b^{40, 12}_2 ∨ -b^{40, 12}_1 ∨ -b^{40, 12}_0 ∨ false 
c  in DIMACS:
-16085 -16086 -16087  0

c i = 13
c  -2+1 --> -1
c    ( b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧  p_520) -> ( b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0)
c  in CNF:
c    -b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨  b^{40, 14}_2
c    -b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_1
c    -b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨  b^{40, 14}_0
c  in DIMACS:
-16088 -16089  16090 -520  16091 0
-16088 -16089  16090 -520 -16092 0
-16088 -16089  16090 -520  16093 0

c  -1+1 --> 0
c    ( b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0 ∧  p_520) -> (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧ -b^{40, 14}_0)
c  in CNF:
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_2
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_1
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_0
c  in DIMACS:
-16088  16089 -16090 -520 -16091 0
-16088  16089 -16090 -520 -16092 0
-16088  16089 -16090 -520 -16093 0

c  0+1 --> 1
c    (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧  p_520) -> (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0)
c  in CNF:
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_2
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_1
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨  b^{40, 14}_0
c  in DIMACS:
 16088  16089  16090 -520 -16091 0
 16088  16089  16090 -520 -16092 0
 16088  16089  16090 -520  16093 0

c  1+1 --> 2
c    (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0 ∧  p_520) -> (-b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0)
c  in CNF:
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_2
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨  b^{40, 14}_1
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ -p_520 ∨ -b^{40, 14}_0
c  in DIMACS:
 16088  16089 -16090 -520 -16091 0
 16088  16089 -16090 -520  16092 0
 16088  16089 -16090 -520 -16093 0

c  2+1 --> break 
c    (-b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧  p_520) -> break
c  in CNF:
c     b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 16088 -16089  16090 -520 1162 0


c  2-1 --> 1
c    (-b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧ -p_520) -> (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0)
c  in CNF:
c     b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_2
c     b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_1
c     b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨  b^{40, 14}_0
c  in DIMACS:
 16088 -16089  16090  520 -16091 0
 16088 -16089  16090  520 -16092 0
 16088 -16089  16090  520  16093 0

c  1-1 --> 0
c    (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0 ∧ -p_520) -> (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧ -b^{40, 14}_0)
c  in CNF:
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_2
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_1
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_0
c  in DIMACS:
 16088  16089 -16090  520 -16091 0
 16088  16089 -16090  520 -16092 0
 16088  16089 -16090  520 -16093 0

c  0-1 --> -1
c    (-b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧ -p_520) -> ( b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0)
c  in CNF:
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨  b^{40, 14}_2
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_1
c     b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨  b^{40, 14}_0
c  in DIMACS:
 16088  16089  16090  520  16091 0
 16088  16089  16090  520 -16092 0
 16088  16089  16090  520  16093 0

c  -1-1 --> -2
c    ( b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧  b^{40, 13}_0 ∧ -p_520) -> ( b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0)
c  in CNF:
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨  b^{40, 14}_2
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨  b^{40, 14}_1
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨  p_520 ∨ -b^{40, 14}_0
c  in DIMACS:
-16088  16089 -16090  520  16091 0
-16088  16089 -16090  520  16092 0
-16088  16089 -16090  520 -16093 0

c  -2-1 --> break 
c    ( b^{40, 13}_2 ∧  b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨  b^{40, 13}_0 ∨  p_520 ∨ break
c  in DIMACS:
-16088 -16089  16090  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 13}_2 ∧ -b^{40, 13}_1 ∧ -b^{40, 13}_0 ∧ true) 
c  in CNF:
c    -b^{40, 13}_2 ∨  b^{40, 13}_1 ∨  b^{40, 13}_0 ∨ false 
c  in DIMACS:
-16088  16089  16090  0

c  3 does not represent an automaton state.
c    -(-b^{40, 13}_2 ∧  b^{40, 13}_1 ∧  b^{40, 13}_0 ∧ true) 
c  in CNF:
c     b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ false 
c  in DIMACS:
 16088 -16089 -16090  0
c  -3 does not represent an automaton state.
c    -( b^{40, 13}_2 ∧  b^{40, 13}_1 ∧  b^{40, 13}_0 ∧ true) 
c  in CNF:
c    -b^{40, 13}_2 ∨ -b^{40, 13}_1 ∨ -b^{40, 13}_0 ∨ false 
c  in DIMACS:
-16088 -16089 -16090  0

c i = 14
c  -2+1 --> -1
c    ( b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧  p_560) -> ( b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0)
c  in CNF:
c    -b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨  b^{40, 15}_2
c    -b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_1
c    -b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨  b^{40, 15}_0
c  in DIMACS:
-16091 -16092  16093 -560  16094 0
-16091 -16092  16093 -560 -16095 0
-16091 -16092  16093 -560  16096 0

c  -1+1 --> 0
c    ( b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0 ∧  p_560) -> (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧ -b^{40, 15}_0)
c  in CNF:
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_2
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_1
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_0
c  in DIMACS:
-16091  16092 -16093 -560 -16094 0
-16091  16092 -16093 -560 -16095 0
-16091  16092 -16093 -560 -16096 0

c  0+1 --> 1
c    (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧  p_560) -> (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0)
c  in CNF:
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_2
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_1
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨  b^{40, 15}_0
c  in DIMACS:
 16091  16092  16093 -560 -16094 0
 16091  16092  16093 -560 -16095 0
 16091  16092  16093 -560  16096 0

c  1+1 --> 2
c    (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0 ∧  p_560) -> (-b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0)
c  in CNF:
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_2
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨  b^{40, 15}_1
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ -p_560 ∨ -b^{40, 15}_0
c  in DIMACS:
 16091  16092 -16093 -560 -16094 0
 16091  16092 -16093 -560  16095 0
 16091  16092 -16093 -560 -16096 0

c  2+1 --> break 
c    (-b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧  p_560) -> break
c  in CNF:
c     b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 16091 -16092  16093 -560 1162 0


c  2-1 --> 1
c    (-b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧ -p_560) -> (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0)
c  in CNF:
c     b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_2
c     b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_1
c     b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨  b^{40, 15}_0
c  in DIMACS:
 16091 -16092  16093  560 -16094 0
 16091 -16092  16093  560 -16095 0
 16091 -16092  16093  560  16096 0

c  1-1 --> 0
c    (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0 ∧ -p_560) -> (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧ -b^{40, 15}_0)
c  in CNF:
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_2
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_1
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_0
c  in DIMACS:
 16091  16092 -16093  560 -16094 0
 16091  16092 -16093  560 -16095 0
 16091  16092 -16093  560 -16096 0

c  0-1 --> -1
c    (-b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧ -p_560) -> ( b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0)
c  in CNF:
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨  b^{40, 15}_2
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_1
c     b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨  b^{40, 15}_0
c  in DIMACS:
 16091  16092  16093  560  16094 0
 16091  16092  16093  560 -16095 0
 16091  16092  16093  560  16096 0

c  -1-1 --> -2
c    ( b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧  b^{40, 14}_0 ∧ -p_560) -> ( b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0)
c  in CNF:
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨  b^{40, 15}_2
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨  b^{40, 15}_1
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨  p_560 ∨ -b^{40, 15}_0
c  in DIMACS:
-16091  16092 -16093  560  16094 0
-16091  16092 -16093  560  16095 0
-16091  16092 -16093  560 -16096 0

c  -2-1 --> break 
c    ( b^{40, 14}_2 ∧  b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨  b^{40, 14}_0 ∨  p_560 ∨ break
c  in DIMACS:
-16091 -16092  16093  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 14}_2 ∧ -b^{40, 14}_1 ∧ -b^{40, 14}_0 ∧ true) 
c  in CNF:
c    -b^{40, 14}_2 ∨  b^{40, 14}_1 ∨  b^{40, 14}_0 ∨ false 
c  in DIMACS:
-16091  16092  16093  0

c  3 does not represent an automaton state.
c    -(-b^{40, 14}_2 ∧  b^{40, 14}_1 ∧  b^{40, 14}_0 ∧ true) 
c  in CNF:
c     b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ false 
c  in DIMACS:
 16091 -16092 -16093  0
c  -3 does not represent an automaton state.
c    -( b^{40, 14}_2 ∧  b^{40, 14}_1 ∧  b^{40, 14}_0 ∧ true) 
c  in CNF:
c    -b^{40, 14}_2 ∨ -b^{40, 14}_1 ∨ -b^{40, 14}_0 ∨ false 
c  in DIMACS:
-16091 -16092 -16093  0

c i = 15
c  -2+1 --> -1
c    ( b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧  p_600) -> ( b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0)
c  in CNF:
c    -b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨  b^{40, 16}_2
c    -b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_1
c    -b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨  b^{40, 16}_0
c  in DIMACS:
-16094 -16095  16096 -600  16097 0
-16094 -16095  16096 -600 -16098 0
-16094 -16095  16096 -600  16099 0

c  -1+1 --> 0
c    ( b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0 ∧  p_600) -> (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧ -b^{40, 16}_0)
c  in CNF:
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_2
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_1
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_0
c  in DIMACS:
-16094  16095 -16096 -600 -16097 0
-16094  16095 -16096 -600 -16098 0
-16094  16095 -16096 -600 -16099 0

c  0+1 --> 1
c    (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧  p_600) -> (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0)
c  in CNF:
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_2
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_1
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨  b^{40, 16}_0
c  in DIMACS:
 16094  16095  16096 -600 -16097 0
 16094  16095  16096 -600 -16098 0
 16094  16095  16096 -600  16099 0

c  1+1 --> 2
c    (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0 ∧  p_600) -> (-b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0)
c  in CNF:
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_2
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨  b^{40, 16}_1
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ -p_600 ∨ -b^{40, 16}_0
c  in DIMACS:
 16094  16095 -16096 -600 -16097 0
 16094  16095 -16096 -600  16098 0
 16094  16095 -16096 -600 -16099 0

c  2+1 --> break 
c    (-b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧  p_600) -> break
c  in CNF:
c     b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 16094 -16095  16096 -600 1162 0


c  2-1 --> 1
c    (-b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧ -p_600) -> (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0)
c  in CNF:
c     b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_2
c     b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_1
c     b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨  b^{40, 16}_0
c  in DIMACS:
 16094 -16095  16096  600 -16097 0
 16094 -16095  16096  600 -16098 0
 16094 -16095  16096  600  16099 0

c  1-1 --> 0
c    (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0 ∧ -p_600) -> (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧ -b^{40, 16}_0)
c  in CNF:
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_2
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_1
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_0
c  in DIMACS:
 16094  16095 -16096  600 -16097 0
 16094  16095 -16096  600 -16098 0
 16094  16095 -16096  600 -16099 0

c  0-1 --> -1
c    (-b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧ -p_600) -> ( b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0)
c  in CNF:
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨  b^{40, 16}_2
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_1
c     b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨  b^{40, 16}_0
c  in DIMACS:
 16094  16095  16096  600  16097 0
 16094  16095  16096  600 -16098 0
 16094  16095  16096  600  16099 0

c  -1-1 --> -2
c    ( b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧  b^{40, 15}_0 ∧ -p_600) -> ( b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0)
c  in CNF:
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨  b^{40, 16}_2
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨  b^{40, 16}_1
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨  p_600 ∨ -b^{40, 16}_0
c  in DIMACS:
-16094  16095 -16096  600  16097 0
-16094  16095 -16096  600  16098 0
-16094  16095 -16096  600 -16099 0

c  -2-1 --> break 
c    ( b^{40, 15}_2 ∧  b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨  b^{40, 15}_0 ∨  p_600 ∨ break
c  in DIMACS:
-16094 -16095  16096  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 15}_2 ∧ -b^{40, 15}_1 ∧ -b^{40, 15}_0 ∧ true) 
c  in CNF:
c    -b^{40, 15}_2 ∨  b^{40, 15}_1 ∨  b^{40, 15}_0 ∨ false 
c  in DIMACS:
-16094  16095  16096  0

c  3 does not represent an automaton state.
c    -(-b^{40, 15}_2 ∧  b^{40, 15}_1 ∧  b^{40, 15}_0 ∧ true) 
c  in CNF:
c     b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ false 
c  in DIMACS:
 16094 -16095 -16096  0
c  -3 does not represent an automaton state.
c    -( b^{40, 15}_2 ∧  b^{40, 15}_1 ∧  b^{40, 15}_0 ∧ true) 
c  in CNF:
c    -b^{40, 15}_2 ∨ -b^{40, 15}_1 ∨ -b^{40, 15}_0 ∨ false 
c  in DIMACS:
-16094 -16095 -16096  0

c i = 16
c  -2+1 --> -1
c    ( b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧  p_640) -> ( b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0)
c  in CNF:
c    -b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨  b^{40, 17}_2
c    -b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_1
c    -b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨  b^{40, 17}_0
c  in DIMACS:
-16097 -16098  16099 -640  16100 0
-16097 -16098  16099 -640 -16101 0
-16097 -16098  16099 -640  16102 0

c  -1+1 --> 0
c    ( b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0 ∧  p_640) -> (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧ -b^{40, 17}_0)
c  in CNF:
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_2
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_1
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_0
c  in DIMACS:
-16097  16098 -16099 -640 -16100 0
-16097  16098 -16099 -640 -16101 0
-16097  16098 -16099 -640 -16102 0

c  0+1 --> 1
c    (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧  p_640) -> (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0)
c  in CNF:
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_2
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_1
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨  b^{40, 17}_0
c  in DIMACS:
 16097  16098  16099 -640 -16100 0
 16097  16098  16099 -640 -16101 0
 16097  16098  16099 -640  16102 0

c  1+1 --> 2
c    (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0 ∧  p_640) -> (-b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0)
c  in CNF:
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_2
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨  b^{40, 17}_1
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ -p_640 ∨ -b^{40, 17}_0
c  in DIMACS:
 16097  16098 -16099 -640 -16100 0
 16097  16098 -16099 -640  16101 0
 16097  16098 -16099 -640 -16102 0

c  2+1 --> break 
c    (-b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧  p_640) -> break
c  in CNF:
c     b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 16097 -16098  16099 -640 1162 0


c  2-1 --> 1
c    (-b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧ -p_640) -> (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0)
c  in CNF:
c     b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_2
c     b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_1
c     b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨  b^{40, 17}_0
c  in DIMACS:
 16097 -16098  16099  640 -16100 0
 16097 -16098  16099  640 -16101 0
 16097 -16098  16099  640  16102 0

c  1-1 --> 0
c    (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0 ∧ -p_640) -> (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧ -b^{40, 17}_0)
c  in CNF:
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_2
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_1
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_0
c  in DIMACS:
 16097  16098 -16099  640 -16100 0
 16097  16098 -16099  640 -16101 0
 16097  16098 -16099  640 -16102 0

c  0-1 --> -1
c    (-b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧ -p_640) -> ( b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0)
c  in CNF:
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨  b^{40, 17}_2
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_1
c     b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨  b^{40, 17}_0
c  in DIMACS:
 16097  16098  16099  640  16100 0
 16097  16098  16099  640 -16101 0
 16097  16098  16099  640  16102 0

c  -1-1 --> -2
c    ( b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧  b^{40, 16}_0 ∧ -p_640) -> ( b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0)
c  in CNF:
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨  b^{40, 17}_2
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨  b^{40, 17}_1
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨  p_640 ∨ -b^{40, 17}_0
c  in DIMACS:
-16097  16098 -16099  640  16100 0
-16097  16098 -16099  640  16101 0
-16097  16098 -16099  640 -16102 0

c  -2-1 --> break 
c    ( b^{40, 16}_2 ∧  b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨  b^{40, 16}_0 ∨  p_640 ∨ break
c  in DIMACS:
-16097 -16098  16099  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 16}_2 ∧ -b^{40, 16}_1 ∧ -b^{40, 16}_0 ∧ true) 
c  in CNF:
c    -b^{40, 16}_2 ∨  b^{40, 16}_1 ∨  b^{40, 16}_0 ∨ false 
c  in DIMACS:
-16097  16098  16099  0

c  3 does not represent an automaton state.
c    -(-b^{40, 16}_2 ∧  b^{40, 16}_1 ∧  b^{40, 16}_0 ∧ true) 
c  in CNF:
c     b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ false 
c  in DIMACS:
 16097 -16098 -16099  0
c  -3 does not represent an automaton state.
c    -( b^{40, 16}_2 ∧  b^{40, 16}_1 ∧  b^{40, 16}_0 ∧ true) 
c  in CNF:
c    -b^{40, 16}_2 ∨ -b^{40, 16}_1 ∨ -b^{40, 16}_0 ∨ false 
c  in DIMACS:
-16097 -16098 -16099  0

c i = 17
c  -2+1 --> -1
c    ( b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧  p_680) -> ( b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0)
c  in CNF:
c    -b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨  b^{40, 18}_2
c    -b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_1
c    -b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨  b^{40, 18}_0
c  in DIMACS:
-16100 -16101  16102 -680  16103 0
-16100 -16101  16102 -680 -16104 0
-16100 -16101  16102 -680  16105 0

c  -1+1 --> 0
c    ( b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0 ∧  p_680) -> (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧ -b^{40, 18}_0)
c  in CNF:
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_2
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_1
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_0
c  in DIMACS:
-16100  16101 -16102 -680 -16103 0
-16100  16101 -16102 -680 -16104 0
-16100  16101 -16102 -680 -16105 0

c  0+1 --> 1
c    (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧  p_680) -> (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0)
c  in CNF:
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_2
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_1
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨  b^{40, 18}_0
c  in DIMACS:
 16100  16101  16102 -680 -16103 0
 16100  16101  16102 -680 -16104 0
 16100  16101  16102 -680  16105 0

c  1+1 --> 2
c    (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0 ∧  p_680) -> (-b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0)
c  in CNF:
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_2
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨  b^{40, 18}_1
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ -p_680 ∨ -b^{40, 18}_0
c  in DIMACS:
 16100  16101 -16102 -680 -16103 0
 16100  16101 -16102 -680  16104 0
 16100  16101 -16102 -680 -16105 0

c  2+1 --> break 
c    (-b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧  p_680) -> break
c  in CNF:
c     b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 16100 -16101  16102 -680 1162 0


c  2-1 --> 1
c    (-b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧ -p_680) -> (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0)
c  in CNF:
c     b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_2
c     b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_1
c     b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨  b^{40, 18}_0
c  in DIMACS:
 16100 -16101  16102  680 -16103 0
 16100 -16101  16102  680 -16104 0
 16100 -16101  16102  680  16105 0

c  1-1 --> 0
c    (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0 ∧ -p_680) -> (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧ -b^{40, 18}_0)
c  in CNF:
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_2
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_1
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_0
c  in DIMACS:
 16100  16101 -16102  680 -16103 0
 16100  16101 -16102  680 -16104 0
 16100  16101 -16102  680 -16105 0

c  0-1 --> -1
c    (-b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧ -p_680) -> ( b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0)
c  in CNF:
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨  b^{40, 18}_2
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_1
c     b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨  b^{40, 18}_0
c  in DIMACS:
 16100  16101  16102  680  16103 0
 16100  16101  16102  680 -16104 0
 16100  16101  16102  680  16105 0

c  -1-1 --> -2
c    ( b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧  b^{40, 17}_0 ∧ -p_680) -> ( b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0)
c  in CNF:
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨  b^{40, 18}_2
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨  b^{40, 18}_1
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨  p_680 ∨ -b^{40, 18}_0
c  in DIMACS:
-16100  16101 -16102  680  16103 0
-16100  16101 -16102  680  16104 0
-16100  16101 -16102  680 -16105 0

c  -2-1 --> break 
c    ( b^{40, 17}_2 ∧  b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨  b^{40, 17}_0 ∨  p_680 ∨ break
c  in DIMACS:
-16100 -16101  16102  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 17}_2 ∧ -b^{40, 17}_1 ∧ -b^{40, 17}_0 ∧ true) 
c  in CNF:
c    -b^{40, 17}_2 ∨  b^{40, 17}_1 ∨  b^{40, 17}_0 ∨ false 
c  in DIMACS:
-16100  16101  16102  0

c  3 does not represent an automaton state.
c    -(-b^{40, 17}_2 ∧  b^{40, 17}_1 ∧  b^{40, 17}_0 ∧ true) 
c  in CNF:
c     b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ false 
c  in DIMACS:
 16100 -16101 -16102  0
c  -3 does not represent an automaton state.
c    -( b^{40, 17}_2 ∧  b^{40, 17}_1 ∧  b^{40, 17}_0 ∧ true) 
c  in CNF:
c    -b^{40, 17}_2 ∨ -b^{40, 17}_1 ∨ -b^{40, 17}_0 ∨ false 
c  in DIMACS:
-16100 -16101 -16102  0

c i = 18
c  -2+1 --> -1
c    ( b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧  p_720) -> ( b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0)
c  in CNF:
c    -b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨  b^{40, 19}_2
c    -b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_1
c    -b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨  b^{40, 19}_0
c  in DIMACS:
-16103 -16104  16105 -720  16106 0
-16103 -16104  16105 -720 -16107 0
-16103 -16104  16105 -720  16108 0

c  -1+1 --> 0
c    ( b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0 ∧  p_720) -> (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧ -b^{40, 19}_0)
c  in CNF:
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_2
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_1
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_0
c  in DIMACS:
-16103  16104 -16105 -720 -16106 0
-16103  16104 -16105 -720 -16107 0
-16103  16104 -16105 -720 -16108 0

c  0+1 --> 1
c    (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧  p_720) -> (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0)
c  in CNF:
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_2
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_1
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨  b^{40, 19}_0
c  in DIMACS:
 16103  16104  16105 -720 -16106 0
 16103  16104  16105 -720 -16107 0
 16103  16104  16105 -720  16108 0

c  1+1 --> 2
c    (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0 ∧  p_720) -> (-b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0)
c  in CNF:
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_2
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨  b^{40, 19}_1
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ -p_720 ∨ -b^{40, 19}_0
c  in DIMACS:
 16103  16104 -16105 -720 -16106 0
 16103  16104 -16105 -720  16107 0
 16103  16104 -16105 -720 -16108 0

c  2+1 --> break 
c    (-b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧  p_720) -> break
c  in CNF:
c     b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 16103 -16104  16105 -720 1162 0


c  2-1 --> 1
c    (-b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧ -p_720) -> (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0)
c  in CNF:
c     b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_2
c     b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_1
c     b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨  b^{40, 19}_0
c  in DIMACS:
 16103 -16104  16105  720 -16106 0
 16103 -16104  16105  720 -16107 0
 16103 -16104  16105  720  16108 0

c  1-1 --> 0
c    (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0 ∧ -p_720) -> (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧ -b^{40, 19}_0)
c  in CNF:
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_2
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_1
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_0
c  in DIMACS:
 16103  16104 -16105  720 -16106 0
 16103  16104 -16105  720 -16107 0
 16103  16104 -16105  720 -16108 0

c  0-1 --> -1
c    (-b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧ -p_720) -> ( b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0)
c  in CNF:
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨  b^{40, 19}_2
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_1
c     b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨  b^{40, 19}_0
c  in DIMACS:
 16103  16104  16105  720  16106 0
 16103  16104  16105  720 -16107 0
 16103  16104  16105  720  16108 0

c  -1-1 --> -2
c    ( b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧  b^{40, 18}_0 ∧ -p_720) -> ( b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0)
c  in CNF:
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨  b^{40, 19}_2
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨  b^{40, 19}_1
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨  p_720 ∨ -b^{40, 19}_0
c  in DIMACS:
-16103  16104 -16105  720  16106 0
-16103  16104 -16105  720  16107 0
-16103  16104 -16105  720 -16108 0

c  -2-1 --> break 
c    ( b^{40, 18}_2 ∧  b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨  b^{40, 18}_0 ∨  p_720 ∨ break
c  in DIMACS:
-16103 -16104  16105  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 18}_2 ∧ -b^{40, 18}_1 ∧ -b^{40, 18}_0 ∧ true) 
c  in CNF:
c    -b^{40, 18}_2 ∨  b^{40, 18}_1 ∨  b^{40, 18}_0 ∨ false 
c  in DIMACS:
-16103  16104  16105  0

c  3 does not represent an automaton state.
c    -(-b^{40, 18}_2 ∧  b^{40, 18}_1 ∧  b^{40, 18}_0 ∧ true) 
c  in CNF:
c     b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ false 
c  in DIMACS:
 16103 -16104 -16105  0
c  -3 does not represent an automaton state.
c    -( b^{40, 18}_2 ∧  b^{40, 18}_1 ∧  b^{40, 18}_0 ∧ true) 
c  in CNF:
c    -b^{40, 18}_2 ∨ -b^{40, 18}_1 ∨ -b^{40, 18}_0 ∨ false 
c  in DIMACS:
-16103 -16104 -16105  0

c i = 19
c  -2+1 --> -1
c    ( b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧  p_760) -> ( b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0)
c  in CNF:
c    -b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨  b^{40, 20}_2
c    -b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_1
c    -b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨  b^{40, 20}_0
c  in DIMACS:
-16106 -16107  16108 -760  16109 0
-16106 -16107  16108 -760 -16110 0
-16106 -16107  16108 -760  16111 0

c  -1+1 --> 0
c    ( b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0 ∧  p_760) -> (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧ -b^{40, 20}_0)
c  in CNF:
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_2
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_1
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_0
c  in DIMACS:
-16106  16107 -16108 -760 -16109 0
-16106  16107 -16108 -760 -16110 0
-16106  16107 -16108 -760 -16111 0

c  0+1 --> 1
c    (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧  p_760) -> (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0)
c  in CNF:
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_2
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_1
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨  b^{40, 20}_0
c  in DIMACS:
 16106  16107  16108 -760 -16109 0
 16106  16107  16108 -760 -16110 0
 16106  16107  16108 -760  16111 0

c  1+1 --> 2
c    (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0 ∧  p_760) -> (-b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0)
c  in CNF:
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_2
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨  b^{40, 20}_1
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ -p_760 ∨ -b^{40, 20}_0
c  in DIMACS:
 16106  16107 -16108 -760 -16109 0
 16106  16107 -16108 -760  16110 0
 16106  16107 -16108 -760 -16111 0

c  2+1 --> break 
c    (-b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧  p_760) -> break
c  in CNF:
c     b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 16106 -16107  16108 -760 1162 0


c  2-1 --> 1
c    (-b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧ -p_760) -> (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0)
c  in CNF:
c     b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_2
c     b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_1
c     b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨  b^{40, 20}_0
c  in DIMACS:
 16106 -16107  16108  760 -16109 0
 16106 -16107  16108  760 -16110 0
 16106 -16107  16108  760  16111 0

c  1-1 --> 0
c    (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0 ∧ -p_760) -> (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧ -b^{40, 20}_0)
c  in CNF:
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_2
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_1
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_0
c  in DIMACS:
 16106  16107 -16108  760 -16109 0
 16106  16107 -16108  760 -16110 0
 16106  16107 -16108  760 -16111 0

c  0-1 --> -1
c    (-b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧ -p_760) -> ( b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0)
c  in CNF:
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨  b^{40, 20}_2
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_1
c     b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨  b^{40, 20}_0
c  in DIMACS:
 16106  16107  16108  760  16109 0
 16106  16107  16108  760 -16110 0
 16106  16107  16108  760  16111 0

c  -1-1 --> -2
c    ( b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧  b^{40, 19}_0 ∧ -p_760) -> ( b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0)
c  in CNF:
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨  b^{40, 20}_2
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨  b^{40, 20}_1
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨  p_760 ∨ -b^{40, 20}_0
c  in DIMACS:
-16106  16107 -16108  760  16109 0
-16106  16107 -16108  760  16110 0
-16106  16107 -16108  760 -16111 0

c  -2-1 --> break 
c    ( b^{40, 19}_2 ∧  b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨  b^{40, 19}_0 ∨  p_760 ∨ break
c  in DIMACS:
-16106 -16107  16108  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 19}_2 ∧ -b^{40, 19}_1 ∧ -b^{40, 19}_0 ∧ true) 
c  in CNF:
c    -b^{40, 19}_2 ∨  b^{40, 19}_1 ∨  b^{40, 19}_0 ∨ false 
c  in DIMACS:
-16106  16107  16108  0

c  3 does not represent an automaton state.
c    -(-b^{40, 19}_2 ∧  b^{40, 19}_1 ∧  b^{40, 19}_0 ∧ true) 
c  in CNF:
c     b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ false 
c  in DIMACS:
 16106 -16107 -16108  0
c  -3 does not represent an automaton state.
c    -( b^{40, 19}_2 ∧  b^{40, 19}_1 ∧  b^{40, 19}_0 ∧ true) 
c  in CNF:
c    -b^{40, 19}_2 ∨ -b^{40, 19}_1 ∨ -b^{40, 19}_0 ∨ false 
c  in DIMACS:
-16106 -16107 -16108  0

c i = 20
c  -2+1 --> -1
c    ( b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧  p_800) -> ( b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0)
c  in CNF:
c    -b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨  b^{40, 21}_2
c    -b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_1
c    -b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨  b^{40, 21}_0
c  in DIMACS:
-16109 -16110  16111 -800  16112 0
-16109 -16110  16111 -800 -16113 0
-16109 -16110  16111 -800  16114 0

c  -1+1 --> 0
c    ( b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0 ∧  p_800) -> (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧ -b^{40, 21}_0)
c  in CNF:
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_2
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_1
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_0
c  in DIMACS:
-16109  16110 -16111 -800 -16112 0
-16109  16110 -16111 -800 -16113 0
-16109  16110 -16111 -800 -16114 0

c  0+1 --> 1
c    (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧  p_800) -> (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0)
c  in CNF:
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_2
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_1
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨  b^{40, 21}_0
c  in DIMACS:
 16109  16110  16111 -800 -16112 0
 16109  16110  16111 -800 -16113 0
 16109  16110  16111 -800  16114 0

c  1+1 --> 2
c    (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0 ∧  p_800) -> (-b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0)
c  in CNF:
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_2
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨  b^{40, 21}_1
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ -p_800 ∨ -b^{40, 21}_0
c  in DIMACS:
 16109  16110 -16111 -800 -16112 0
 16109  16110 -16111 -800  16113 0
 16109  16110 -16111 -800 -16114 0

c  2+1 --> break 
c    (-b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧  p_800) -> break
c  in CNF:
c     b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 16109 -16110  16111 -800 1162 0


c  2-1 --> 1
c    (-b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧ -p_800) -> (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0)
c  in CNF:
c     b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_2
c     b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_1
c     b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨  b^{40, 21}_0
c  in DIMACS:
 16109 -16110  16111  800 -16112 0
 16109 -16110  16111  800 -16113 0
 16109 -16110  16111  800  16114 0

c  1-1 --> 0
c    (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0 ∧ -p_800) -> (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧ -b^{40, 21}_0)
c  in CNF:
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_2
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_1
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_0
c  in DIMACS:
 16109  16110 -16111  800 -16112 0
 16109  16110 -16111  800 -16113 0
 16109  16110 -16111  800 -16114 0

c  0-1 --> -1
c    (-b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧ -p_800) -> ( b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0)
c  in CNF:
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨  b^{40, 21}_2
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_1
c     b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨  b^{40, 21}_0
c  in DIMACS:
 16109  16110  16111  800  16112 0
 16109  16110  16111  800 -16113 0
 16109  16110  16111  800  16114 0

c  -1-1 --> -2
c    ( b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧  b^{40, 20}_0 ∧ -p_800) -> ( b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0)
c  in CNF:
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨  b^{40, 21}_2
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨  b^{40, 21}_1
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨  p_800 ∨ -b^{40, 21}_0
c  in DIMACS:
-16109  16110 -16111  800  16112 0
-16109  16110 -16111  800  16113 0
-16109  16110 -16111  800 -16114 0

c  -2-1 --> break 
c    ( b^{40, 20}_2 ∧  b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨  b^{40, 20}_0 ∨  p_800 ∨ break
c  in DIMACS:
-16109 -16110  16111  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 20}_2 ∧ -b^{40, 20}_1 ∧ -b^{40, 20}_0 ∧ true) 
c  in CNF:
c    -b^{40, 20}_2 ∨  b^{40, 20}_1 ∨  b^{40, 20}_0 ∨ false 
c  in DIMACS:
-16109  16110  16111  0

c  3 does not represent an automaton state.
c    -(-b^{40, 20}_2 ∧  b^{40, 20}_1 ∧  b^{40, 20}_0 ∧ true) 
c  in CNF:
c     b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ false 
c  in DIMACS:
 16109 -16110 -16111  0
c  -3 does not represent an automaton state.
c    -( b^{40, 20}_2 ∧  b^{40, 20}_1 ∧  b^{40, 20}_0 ∧ true) 
c  in CNF:
c    -b^{40, 20}_2 ∨ -b^{40, 20}_1 ∨ -b^{40, 20}_0 ∨ false 
c  in DIMACS:
-16109 -16110 -16111  0

c i = 21
c  -2+1 --> -1
c    ( b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧  p_840) -> ( b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0)
c  in CNF:
c    -b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨  b^{40, 22}_2
c    -b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_1
c    -b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨  b^{40, 22}_0
c  in DIMACS:
-16112 -16113  16114 -840  16115 0
-16112 -16113  16114 -840 -16116 0
-16112 -16113  16114 -840  16117 0

c  -1+1 --> 0
c    ( b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0 ∧  p_840) -> (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧ -b^{40, 22}_0)
c  in CNF:
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_2
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_1
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_0
c  in DIMACS:
-16112  16113 -16114 -840 -16115 0
-16112  16113 -16114 -840 -16116 0
-16112  16113 -16114 -840 -16117 0

c  0+1 --> 1
c    (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧  p_840) -> (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0)
c  in CNF:
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_2
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_1
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨  b^{40, 22}_0
c  in DIMACS:
 16112  16113  16114 -840 -16115 0
 16112  16113  16114 -840 -16116 0
 16112  16113  16114 -840  16117 0

c  1+1 --> 2
c    (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0 ∧  p_840) -> (-b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0)
c  in CNF:
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_2
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨  b^{40, 22}_1
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ -p_840 ∨ -b^{40, 22}_0
c  in DIMACS:
 16112  16113 -16114 -840 -16115 0
 16112  16113 -16114 -840  16116 0
 16112  16113 -16114 -840 -16117 0

c  2+1 --> break 
c    (-b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧  p_840) -> break
c  in CNF:
c     b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 16112 -16113  16114 -840 1162 0


c  2-1 --> 1
c    (-b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧ -p_840) -> (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0)
c  in CNF:
c     b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_2
c     b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_1
c     b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨  b^{40, 22}_0
c  in DIMACS:
 16112 -16113  16114  840 -16115 0
 16112 -16113  16114  840 -16116 0
 16112 -16113  16114  840  16117 0

c  1-1 --> 0
c    (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0 ∧ -p_840) -> (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧ -b^{40, 22}_0)
c  in CNF:
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_2
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_1
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_0
c  in DIMACS:
 16112  16113 -16114  840 -16115 0
 16112  16113 -16114  840 -16116 0
 16112  16113 -16114  840 -16117 0

c  0-1 --> -1
c    (-b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧ -p_840) -> ( b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0)
c  in CNF:
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨  b^{40, 22}_2
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_1
c     b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨  b^{40, 22}_0
c  in DIMACS:
 16112  16113  16114  840  16115 0
 16112  16113  16114  840 -16116 0
 16112  16113  16114  840  16117 0

c  -1-1 --> -2
c    ( b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧  b^{40, 21}_0 ∧ -p_840) -> ( b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0)
c  in CNF:
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨  b^{40, 22}_2
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨  b^{40, 22}_1
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨  p_840 ∨ -b^{40, 22}_0
c  in DIMACS:
-16112  16113 -16114  840  16115 0
-16112  16113 -16114  840  16116 0
-16112  16113 -16114  840 -16117 0

c  -2-1 --> break 
c    ( b^{40, 21}_2 ∧  b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨  b^{40, 21}_0 ∨  p_840 ∨ break
c  in DIMACS:
-16112 -16113  16114  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 21}_2 ∧ -b^{40, 21}_1 ∧ -b^{40, 21}_0 ∧ true) 
c  in CNF:
c    -b^{40, 21}_2 ∨  b^{40, 21}_1 ∨  b^{40, 21}_0 ∨ false 
c  in DIMACS:
-16112  16113  16114  0

c  3 does not represent an automaton state.
c    -(-b^{40, 21}_2 ∧  b^{40, 21}_1 ∧  b^{40, 21}_0 ∧ true) 
c  in CNF:
c     b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ false 
c  in DIMACS:
 16112 -16113 -16114  0
c  -3 does not represent an automaton state.
c    -( b^{40, 21}_2 ∧  b^{40, 21}_1 ∧  b^{40, 21}_0 ∧ true) 
c  in CNF:
c    -b^{40, 21}_2 ∨ -b^{40, 21}_1 ∨ -b^{40, 21}_0 ∨ false 
c  in DIMACS:
-16112 -16113 -16114  0

c i = 22
c  -2+1 --> -1
c    ( b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧  p_880) -> ( b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0)
c  in CNF:
c    -b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨  b^{40, 23}_2
c    -b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_1
c    -b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨  b^{40, 23}_0
c  in DIMACS:
-16115 -16116  16117 -880  16118 0
-16115 -16116  16117 -880 -16119 0
-16115 -16116  16117 -880  16120 0

c  -1+1 --> 0
c    ( b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0 ∧  p_880) -> (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧ -b^{40, 23}_0)
c  in CNF:
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_2
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_1
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_0
c  in DIMACS:
-16115  16116 -16117 -880 -16118 0
-16115  16116 -16117 -880 -16119 0
-16115  16116 -16117 -880 -16120 0

c  0+1 --> 1
c    (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧  p_880) -> (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0)
c  in CNF:
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_2
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_1
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨  b^{40, 23}_0
c  in DIMACS:
 16115  16116  16117 -880 -16118 0
 16115  16116  16117 -880 -16119 0
 16115  16116  16117 -880  16120 0

c  1+1 --> 2
c    (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0 ∧  p_880) -> (-b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0)
c  in CNF:
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_2
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨  b^{40, 23}_1
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ -p_880 ∨ -b^{40, 23}_0
c  in DIMACS:
 16115  16116 -16117 -880 -16118 0
 16115  16116 -16117 -880  16119 0
 16115  16116 -16117 -880 -16120 0

c  2+1 --> break 
c    (-b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧  p_880) -> break
c  in CNF:
c     b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 16115 -16116  16117 -880 1162 0


c  2-1 --> 1
c    (-b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧ -p_880) -> (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0)
c  in CNF:
c     b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_2
c     b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_1
c     b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨  b^{40, 23}_0
c  in DIMACS:
 16115 -16116  16117  880 -16118 0
 16115 -16116  16117  880 -16119 0
 16115 -16116  16117  880  16120 0

c  1-1 --> 0
c    (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0 ∧ -p_880) -> (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧ -b^{40, 23}_0)
c  in CNF:
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_2
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_1
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_0
c  in DIMACS:
 16115  16116 -16117  880 -16118 0
 16115  16116 -16117  880 -16119 0
 16115  16116 -16117  880 -16120 0

c  0-1 --> -1
c    (-b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧ -p_880) -> ( b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0)
c  in CNF:
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨  b^{40, 23}_2
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_1
c     b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨  b^{40, 23}_0
c  in DIMACS:
 16115  16116  16117  880  16118 0
 16115  16116  16117  880 -16119 0
 16115  16116  16117  880  16120 0

c  -1-1 --> -2
c    ( b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧  b^{40, 22}_0 ∧ -p_880) -> ( b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0)
c  in CNF:
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨  b^{40, 23}_2
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨  b^{40, 23}_1
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨  p_880 ∨ -b^{40, 23}_0
c  in DIMACS:
-16115  16116 -16117  880  16118 0
-16115  16116 -16117  880  16119 0
-16115  16116 -16117  880 -16120 0

c  -2-1 --> break 
c    ( b^{40, 22}_2 ∧  b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨  b^{40, 22}_0 ∨  p_880 ∨ break
c  in DIMACS:
-16115 -16116  16117  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 22}_2 ∧ -b^{40, 22}_1 ∧ -b^{40, 22}_0 ∧ true) 
c  in CNF:
c    -b^{40, 22}_2 ∨  b^{40, 22}_1 ∨  b^{40, 22}_0 ∨ false 
c  in DIMACS:
-16115  16116  16117  0

c  3 does not represent an automaton state.
c    -(-b^{40, 22}_2 ∧  b^{40, 22}_1 ∧  b^{40, 22}_0 ∧ true) 
c  in CNF:
c     b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ false 
c  in DIMACS:
 16115 -16116 -16117  0
c  -3 does not represent an automaton state.
c    -( b^{40, 22}_2 ∧  b^{40, 22}_1 ∧  b^{40, 22}_0 ∧ true) 
c  in CNF:
c    -b^{40, 22}_2 ∨ -b^{40, 22}_1 ∨ -b^{40, 22}_0 ∨ false 
c  in DIMACS:
-16115 -16116 -16117  0

c i = 23
c  -2+1 --> -1
c    ( b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧  p_920) -> ( b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0)
c  in CNF:
c    -b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨  b^{40, 24}_2
c    -b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_1
c    -b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨  b^{40, 24}_0
c  in DIMACS:
-16118 -16119  16120 -920  16121 0
-16118 -16119  16120 -920 -16122 0
-16118 -16119  16120 -920  16123 0

c  -1+1 --> 0
c    ( b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0 ∧  p_920) -> (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧ -b^{40, 24}_0)
c  in CNF:
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_2
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_1
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_0
c  in DIMACS:
-16118  16119 -16120 -920 -16121 0
-16118  16119 -16120 -920 -16122 0
-16118  16119 -16120 -920 -16123 0

c  0+1 --> 1
c    (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧  p_920) -> (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0)
c  in CNF:
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_2
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_1
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨  b^{40, 24}_0
c  in DIMACS:
 16118  16119  16120 -920 -16121 0
 16118  16119  16120 -920 -16122 0
 16118  16119  16120 -920  16123 0

c  1+1 --> 2
c    (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0 ∧  p_920) -> (-b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0)
c  in CNF:
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_2
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨  b^{40, 24}_1
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ -p_920 ∨ -b^{40, 24}_0
c  in DIMACS:
 16118  16119 -16120 -920 -16121 0
 16118  16119 -16120 -920  16122 0
 16118  16119 -16120 -920 -16123 0

c  2+1 --> break 
c    (-b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧  p_920) -> break
c  in CNF:
c     b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 16118 -16119  16120 -920 1162 0


c  2-1 --> 1
c    (-b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧ -p_920) -> (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0)
c  in CNF:
c     b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_2
c     b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_1
c     b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨  b^{40, 24}_0
c  in DIMACS:
 16118 -16119  16120  920 -16121 0
 16118 -16119  16120  920 -16122 0
 16118 -16119  16120  920  16123 0

c  1-1 --> 0
c    (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0 ∧ -p_920) -> (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧ -b^{40, 24}_0)
c  in CNF:
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_2
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_1
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_0
c  in DIMACS:
 16118  16119 -16120  920 -16121 0
 16118  16119 -16120  920 -16122 0
 16118  16119 -16120  920 -16123 0

c  0-1 --> -1
c    (-b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧ -p_920) -> ( b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0)
c  in CNF:
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨  b^{40, 24}_2
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_1
c     b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨  b^{40, 24}_0
c  in DIMACS:
 16118  16119  16120  920  16121 0
 16118  16119  16120  920 -16122 0
 16118  16119  16120  920  16123 0

c  -1-1 --> -2
c    ( b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧  b^{40, 23}_0 ∧ -p_920) -> ( b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0)
c  in CNF:
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨  b^{40, 24}_2
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨  b^{40, 24}_1
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨  p_920 ∨ -b^{40, 24}_0
c  in DIMACS:
-16118  16119 -16120  920  16121 0
-16118  16119 -16120  920  16122 0
-16118  16119 -16120  920 -16123 0

c  -2-1 --> break 
c    ( b^{40, 23}_2 ∧  b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨  b^{40, 23}_0 ∨  p_920 ∨ break
c  in DIMACS:
-16118 -16119  16120  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 23}_2 ∧ -b^{40, 23}_1 ∧ -b^{40, 23}_0 ∧ true) 
c  in CNF:
c    -b^{40, 23}_2 ∨  b^{40, 23}_1 ∨  b^{40, 23}_0 ∨ false 
c  in DIMACS:
-16118  16119  16120  0

c  3 does not represent an automaton state.
c    -(-b^{40, 23}_2 ∧  b^{40, 23}_1 ∧  b^{40, 23}_0 ∧ true) 
c  in CNF:
c     b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ false 
c  in DIMACS:
 16118 -16119 -16120  0
c  -3 does not represent an automaton state.
c    -( b^{40, 23}_2 ∧  b^{40, 23}_1 ∧  b^{40, 23}_0 ∧ true) 
c  in CNF:
c    -b^{40, 23}_2 ∨ -b^{40, 23}_1 ∨ -b^{40, 23}_0 ∨ false 
c  in DIMACS:
-16118 -16119 -16120  0

c i = 24
c  -2+1 --> -1
c    ( b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧  p_960) -> ( b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0)
c  in CNF:
c    -b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨  b^{40, 25}_2
c    -b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_1
c    -b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨  b^{40, 25}_0
c  in DIMACS:
-16121 -16122  16123 -960  16124 0
-16121 -16122  16123 -960 -16125 0
-16121 -16122  16123 -960  16126 0

c  -1+1 --> 0
c    ( b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0 ∧  p_960) -> (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧ -b^{40, 25}_0)
c  in CNF:
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_2
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_1
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_0
c  in DIMACS:
-16121  16122 -16123 -960 -16124 0
-16121  16122 -16123 -960 -16125 0
-16121  16122 -16123 -960 -16126 0

c  0+1 --> 1
c    (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧  p_960) -> (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0)
c  in CNF:
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_2
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_1
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨  b^{40, 25}_0
c  in DIMACS:
 16121  16122  16123 -960 -16124 0
 16121  16122  16123 -960 -16125 0
 16121  16122  16123 -960  16126 0

c  1+1 --> 2
c    (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0 ∧  p_960) -> (-b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0)
c  in CNF:
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_2
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨  b^{40, 25}_1
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ -p_960 ∨ -b^{40, 25}_0
c  in DIMACS:
 16121  16122 -16123 -960 -16124 0
 16121  16122 -16123 -960  16125 0
 16121  16122 -16123 -960 -16126 0

c  2+1 --> break 
c    (-b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧  p_960) -> break
c  in CNF:
c     b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 16121 -16122  16123 -960 1162 0


c  2-1 --> 1
c    (-b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧ -p_960) -> (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0)
c  in CNF:
c     b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_2
c     b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_1
c     b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨  b^{40, 25}_0
c  in DIMACS:
 16121 -16122  16123  960 -16124 0
 16121 -16122  16123  960 -16125 0
 16121 -16122  16123  960  16126 0

c  1-1 --> 0
c    (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0 ∧ -p_960) -> (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧ -b^{40, 25}_0)
c  in CNF:
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_2
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_1
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_0
c  in DIMACS:
 16121  16122 -16123  960 -16124 0
 16121  16122 -16123  960 -16125 0
 16121  16122 -16123  960 -16126 0

c  0-1 --> -1
c    (-b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧ -p_960) -> ( b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0)
c  in CNF:
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨  b^{40, 25}_2
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_1
c     b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨  b^{40, 25}_0
c  in DIMACS:
 16121  16122  16123  960  16124 0
 16121  16122  16123  960 -16125 0
 16121  16122  16123  960  16126 0

c  -1-1 --> -2
c    ( b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧  b^{40, 24}_0 ∧ -p_960) -> ( b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0)
c  in CNF:
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨  b^{40, 25}_2
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨  b^{40, 25}_1
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨  p_960 ∨ -b^{40, 25}_0
c  in DIMACS:
-16121  16122 -16123  960  16124 0
-16121  16122 -16123  960  16125 0
-16121  16122 -16123  960 -16126 0

c  -2-1 --> break 
c    ( b^{40, 24}_2 ∧  b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨  b^{40, 24}_0 ∨  p_960 ∨ break
c  in DIMACS:
-16121 -16122  16123  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 24}_2 ∧ -b^{40, 24}_1 ∧ -b^{40, 24}_0 ∧ true) 
c  in CNF:
c    -b^{40, 24}_2 ∨  b^{40, 24}_1 ∨  b^{40, 24}_0 ∨ false 
c  in DIMACS:
-16121  16122  16123  0

c  3 does not represent an automaton state.
c    -(-b^{40, 24}_2 ∧  b^{40, 24}_1 ∧  b^{40, 24}_0 ∧ true) 
c  in CNF:
c     b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ false 
c  in DIMACS:
 16121 -16122 -16123  0
c  -3 does not represent an automaton state.
c    -( b^{40, 24}_2 ∧  b^{40, 24}_1 ∧  b^{40, 24}_0 ∧ true) 
c  in CNF:
c    -b^{40, 24}_2 ∨ -b^{40, 24}_1 ∨ -b^{40, 24}_0 ∨ false 
c  in DIMACS:
-16121 -16122 -16123  0

c i = 25
c  -2+1 --> -1
c    ( b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧  p_1000) -> ( b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0)
c  in CNF:
c    -b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨  b^{40, 26}_2
c    -b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_1
c    -b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨  b^{40, 26}_0
c  in DIMACS:
-16124 -16125  16126 -1000  16127 0
-16124 -16125  16126 -1000 -16128 0
-16124 -16125  16126 -1000  16129 0

c  -1+1 --> 0
c    ( b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0 ∧  p_1000) -> (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧ -b^{40, 26}_0)
c  in CNF:
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_2
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_1
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_0
c  in DIMACS:
-16124  16125 -16126 -1000 -16127 0
-16124  16125 -16126 -1000 -16128 0
-16124  16125 -16126 -1000 -16129 0

c  0+1 --> 1
c    (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧  p_1000) -> (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0)
c  in CNF:
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_2
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_1
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨  b^{40, 26}_0
c  in DIMACS:
 16124  16125  16126 -1000 -16127 0
 16124  16125  16126 -1000 -16128 0
 16124  16125  16126 -1000  16129 0

c  1+1 --> 2
c    (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0 ∧  p_1000) -> (-b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0)
c  in CNF:
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_2
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨  b^{40, 26}_1
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ -p_1000 ∨ -b^{40, 26}_0
c  in DIMACS:
 16124  16125 -16126 -1000 -16127 0
 16124  16125 -16126 -1000  16128 0
 16124  16125 -16126 -1000 -16129 0

c  2+1 --> break 
c    (-b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 16124 -16125  16126 -1000 1162 0


c  2-1 --> 1
c    (-b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧ -p_1000) -> (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0)
c  in CNF:
c     b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_2
c     b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_1
c     b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨  b^{40, 26}_0
c  in DIMACS:
 16124 -16125  16126  1000 -16127 0
 16124 -16125  16126  1000 -16128 0
 16124 -16125  16126  1000  16129 0

c  1-1 --> 0
c    (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0 ∧ -p_1000) -> (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧ -b^{40, 26}_0)
c  in CNF:
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_2
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_1
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_0
c  in DIMACS:
 16124  16125 -16126  1000 -16127 0
 16124  16125 -16126  1000 -16128 0
 16124  16125 -16126  1000 -16129 0

c  0-1 --> -1
c    (-b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧ -p_1000) -> ( b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0)
c  in CNF:
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨  b^{40, 26}_2
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_1
c     b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨  b^{40, 26}_0
c  in DIMACS:
 16124  16125  16126  1000  16127 0
 16124  16125  16126  1000 -16128 0
 16124  16125  16126  1000  16129 0

c  -1-1 --> -2
c    ( b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧  b^{40, 25}_0 ∧ -p_1000) -> ( b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0)
c  in CNF:
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨  b^{40, 26}_2
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨  b^{40, 26}_1
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨  p_1000 ∨ -b^{40, 26}_0
c  in DIMACS:
-16124  16125 -16126  1000  16127 0
-16124  16125 -16126  1000  16128 0
-16124  16125 -16126  1000 -16129 0

c  -2-1 --> break 
c    ( b^{40, 25}_2 ∧  b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨  b^{40, 25}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-16124 -16125  16126  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 25}_2 ∧ -b^{40, 25}_1 ∧ -b^{40, 25}_0 ∧ true) 
c  in CNF:
c    -b^{40, 25}_2 ∨  b^{40, 25}_1 ∨  b^{40, 25}_0 ∨ false 
c  in DIMACS:
-16124  16125  16126  0

c  3 does not represent an automaton state.
c    -(-b^{40, 25}_2 ∧  b^{40, 25}_1 ∧  b^{40, 25}_0 ∧ true) 
c  in CNF:
c     b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ false 
c  in DIMACS:
 16124 -16125 -16126  0
c  -3 does not represent an automaton state.
c    -( b^{40, 25}_2 ∧  b^{40, 25}_1 ∧  b^{40, 25}_0 ∧ true) 
c  in CNF:
c    -b^{40, 25}_2 ∨ -b^{40, 25}_1 ∨ -b^{40, 25}_0 ∨ false 
c  in DIMACS:
-16124 -16125 -16126  0

c i = 26
c  -2+1 --> -1
c    ( b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧  p_1040) -> ( b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0)
c  in CNF:
c    -b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨  b^{40, 27}_2
c    -b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_1
c    -b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨  b^{40, 27}_0
c  in DIMACS:
-16127 -16128  16129 -1040  16130 0
-16127 -16128  16129 -1040 -16131 0
-16127 -16128  16129 -1040  16132 0

c  -1+1 --> 0
c    ( b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0 ∧  p_1040) -> (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧ -b^{40, 27}_0)
c  in CNF:
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_2
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_1
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_0
c  in DIMACS:
-16127  16128 -16129 -1040 -16130 0
-16127  16128 -16129 -1040 -16131 0
-16127  16128 -16129 -1040 -16132 0

c  0+1 --> 1
c    (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧  p_1040) -> (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0)
c  in CNF:
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_2
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_1
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨  b^{40, 27}_0
c  in DIMACS:
 16127  16128  16129 -1040 -16130 0
 16127  16128  16129 -1040 -16131 0
 16127  16128  16129 -1040  16132 0

c  1+1 --> 2
c    (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0 ∧  p_1040) -> (-b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0)
c  in CNF:
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_2
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨  b^{40, 27}_1
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ -p_1040 ∨ -b^{40, 27}_0
c  in DIMACS:
 16127  16128 -16129 -1040 -16130 0
 16127  16128 -16129 -1040  16131 0
 16127  16128 -16129 -1040 -16132 0

c  2+1 --> break 
c    (-b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 16127 -16128  16129 -1040 1162 0


c  2-1 --> 1
c    (-b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧ -p_1040) -> (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0)
c  in CNF:
c     b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_2
c     b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_1
c     b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨  b^{40, 27}_0
c  in DIMACS:
 16127 -16128  16129  1040 -16130 0
 16127 -16128  16129  1040 -16131 0
 16127 -16128  16129  1040  16132 0

c  1-1 --> 0
c    (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0 ∧ -p_1040) -> (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧ -b^{40, 27}_0)
c  in CNF:
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_2
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_1
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_0
c  in DIMACS:
 16127  16128 -16129  1040 -16130 0
 16127  16128 -16129  1040 -16131 0
 16127  16128 -16129  1040 -16132 0

c  0-1 --> -1
c    (-b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧ -p_1040) -> ( b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0)
c  in CNF:
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨  b^{40, 27}_2
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_1
c     b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨  b^{40, 27}_0
c  in DIMACS:
 16127  16128  16129  1040  16130 0
 16127  16128  16129  1040 -16131 0
 16127  16128  16129  1040  16132 0

c  -1-1 --> -2
c    ( b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧  b^{40, 26}_0 ∧ -p_1040) -> ( b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0)
c  in CNF:
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨  b^{40, 27}_2
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨  b^{40, 27}_1
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨  p_1040 ∨ -b^{40, 27}_0
c  in DIMACS:
-16127  16128 -16129  1040  16130 0
-16127  16128 -16129  1040  16131 0
-16127  16128 -16129  1040 -16132 0

c  -2-1 --> break 
c    ( b^{40, 26}_2 ∧  b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨  b^{40, 26}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-16127 -16128  16129  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 26}_2 ∧ -b^{40, 26}_1 ∧ -b^{40, 26}_0 ∧ true) 
c  in CNF:
c    -b^{40, 26}_2 ∨  b^{40, 26}_1 ∨  b^{40, 26}_0 ∨ false 
c  in DIMACS:
-16127  16128  16129  0

c  3 does not represent an automaton state.
c    -(-b^{40, 26}_2 ∧  b^{40, 26}_1 ∧  b^{40, 26}_0 ∧ true) 
c  in CNF:
c     b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ false 
c  in DIMACS:
 16127 -16128 -16129  0
c  -3 does not represent an automaton state.
c    -( b^{40, 26}_2 ∧  b^{40, 26}_1 ∧  b^{40, 26}_0 ∧ true) 
c  in CNF:
c    -b^{40, 26}_2 ∨ -b^{40, 26}_1 ∨ -b^{40, 26}_0 ∨ false 
c  in DIMACS:
-16127 -16128 -16129  0

c i = 27
c  -2+1 --> -1
c    ( b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧  p_1080) -> ( b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0)
c  in CNF:
c    -b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨  b^{40, 28}_2
c    -b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_1
c    -b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨  b^{40, 28}_0
c  in DIMACS:
-16130 -16131  16132 -1080  16133 0
-16130 -16131  16132 -1080 -16134 0
-16130 -16131  16132 -1080  16135 0

c  -1+1 --> 0
c    ( b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0 ∧  p_1080) -> (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧ -b^{40, 28}_0)
c  in CNF:
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_2
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_1
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_0
c  in DIMACS:
-16130  16131 -16132 -1080 -16133 0
-16130  16131 -16132 -1080 -16134 0
-16130  16131 -16132 -1080 -16135 0

c  0+1 --> 1
c    (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧  p_1080) -> (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0)
c  in CNF:
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_2
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_1
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨  b^{40, 28}_0
c  in DIMACS:
 16130  16131  16132 -1080 -16133 0
 16130  16131  16132 -1080 -16134 0
 16130  16131  16132 -1080  16135 0

c  1+1 --> 2
c    (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0 ∧  p_1080) -> (-b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0)
c  in CNF:
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_2
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨  b^{40, 28}_1
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ -p_1080 ∨ -b^{40, 28}_0
c  in DIMACS:
 16130  16131 -16132 -1080 -16133 0
 16130  16131 -16132 -1080  16134 0
 16130  16131 -16132 -1080 -16135 0

c  2+1 --> break 
c    (-b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 16130 -16131  16132 -1080 1162 0


c  2-1 --> 1
c    (-b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧ -p_1080) -> (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0)
c  in CNF:
c     b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_2
c     b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_1
c     b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨  b^{40, 28}_0
c  in DIMACS:
 16130 -16131  16132  1080 -16133 0
 16130 -16131  16132  1080 -16134 0
 16130 -16131  16132  1080  16135 0

c  1-1 --> 0
c    (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0 ∧ -p_1080) -> (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧ -b^{40, 28}_0)
c  in CNF:
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_2
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_1
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_0
c  in DIMACS:
 16130  16131 -16132  1080 -16133 0
 16130  16131 -16132  1080 -16134 0
 16130  16131 -16132  1080 -16135 0

c  0-1 --> -1
c    (-b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧ -p_1080) -> ( b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0)
c  in CNF:
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨  b^{40, 28}_2
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_1
c     b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨  b^{40, 28}_0
c  in DIMACS:
 16130  16131  16132  1080  16133 0
 16130  16131  16132  1080 -16134 0
 16130  16131  16132  1080  16135 0

c  -1-1 --> -2
c    ( b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧  b^{40, 27}_0 ∧ -p_1080) -> ( b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0)
c  in CNF:
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨  b^{40, 28}_2
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨  b^{40, 28}_1
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨  p_1080 ∨ -b^{40, 28}_0
c  in DIMACS:
-16130  16131 -16132  1080  16133 0
-16130  16131 -16132  1080  16134 0
-16130  16131 -16132  1080 -16135 0

c  -2-1 --> break 
c    ( b^{40, 27}_2 ∧  b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨  b^{40, 27}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-16130 -16131  16132  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 27}_2 ∧ -b^{40, 27}_1 ∧ -b^{40, 27}_0 ∧ true) 
c  in CNF:
c    -b^{40, 27}_2 ∨  b^{40, 27}_1 ∨  b^{40, 27}_0 ∨ false 
c  in DIMACS:
-16130  16131  16132  0

c  3 does not represent an automaton state.
c    -(-b^{40, 27}_2 ∧  b^{40, 27}_1 ∧  b^{40, 27}_0 ∧ true) 
c  in CNF:
c     b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ false 
c  in DIMACS:
 16130 -16131 -16132  0
c  -3 does not represent an automaton state.
c    -( b^{40, 27}_2 ∧  b^{40, 27}_1 ∧  b^{40, 27}_0 ∧ true) 
c  in CNF:
c    -b^{40, 27}_2 ∨ -b^{40, 27}_1 ∨ -b^{40, 27}_0 ∨ false 
c  in DIMACS:
-16130 -16131 -16132  0

c i = 28
c  -2+1 --> -1
c    ( b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧  p_1120) -> ( b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0)
c  in CNF:
c    -b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨  b^{40, 29}_2
c    -b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_1
c    -b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨  b^{40, 29}_0
c  in DIMACS:
-16133 -16134  16135 -1120  16136 0
-16133 -16134  16135 -1120 -16137 0
-16133 -16134  16135 -1120  16138 0

c  -1+1 --> 0
c    ( b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0 ∧  p_1120) -> (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧ -b^{40, 29}_0)
c  in CNF:
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_2
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_1
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_0
c  in DIMACS:
-16133  16134 -16135 -1120 -16136 0
-16133  16134 -16135 -1120 -16137 0
-16133  16134 -16135 -1120 -16138 0

c  0+1 --> 1
c    (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧  p_1120) -> (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0)
c  in CNF:
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_2
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_1
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨  b^{40, 29}_0
c  in DIMACS:
 16133  16134  16135 -1120 -16136 0
 16133  16134  16135 -1120 -16137 0
 16133  16134  16135 -1120  16138 0

c  1+1 --> 2
c    (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0 ∧  p_1120) -> (-b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0)
c  in CNF:
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_2
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨  b^{40, 29}_1
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ -p_1120 ∨ -b^{40, 29}_0
c  in DIMACS:
 16133  16134 -16135 -1120 -16136 0
 16133  16134 -16135 -1120  16137 0
 16133  16134 -16135 -1120 -16138 0

c  2+1 --> break 
c    (-b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 16133 -16134  16135 -1120 1162 0


c  2-1 --> 1
c    (-b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧ -p_1120) -> (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0)
c  in CNF:
c     b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_2
c     b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_1
c     b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨  b^{40, 29}_0
c  in DIMACS:
 16133 -16134  16135  1120 -16136 0
 16133 -16134  16135  1120 -16137 0
 16133 -16134  16135  1120  16138 0

c  1-1 --> 0
c    (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0 ∧ -p_1120) -> (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧ -b^{40, 29}_0)
c  in CNF:
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_2
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_1
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_0
c  in DIMACS:
 16133  16134 -16135  1120 -16136 0
 16133  16134 -16135  1120 -16137 0
 16133  16134 -16135  1120 -16138 0

c  0-1 --> -1
c    (-b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧ -p_1120) -> ( b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0)
c  in CNF:
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨  b^{40, 29}_2
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_1
c     b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨  b^{40, 29}_0
c  in DIMACS:
 16133  16134  16135  1120  16136 0
 16133  16134  16135  1120 -16137 0
 16133  16134  16135  1120  16138 0

c  -1-1 --> -2
c    ( b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧  b^{40, 28}_0 ∧ -p_1120) -> ( b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0)
c  in CNF:
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨  b^{40, 29}_2
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨  b^{40, 29}_1
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨  p_1120 ∨ -b^{40, 29}_0
c  in DIMACS:
-16133  16134 -16135  1120  16136 0
-16133  16134 -16135  1120  16137 0
-16133  16134 -16135  1120 -16138 0

c  -2-1 --> break 
c    ( b^{40, 28}_2 ∧  b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨  b^{40, 28}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-16133 -16134  16135  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 28}_2 ∧ -b^{40, 28}_1 ∧ -b^{40, 28}_0 ∧ true) 
c  in CNF:
c    -b^{40, 28}_2 ∨  b^{40, 28}_1 ∨  b^{40, 28}_0 ∨ false 
c  in DIMACS:
-16133  16134  16135  0

c  3 does not represent an automaton state.
c    -(-b^{40, 28}_2 ∧  b^{40, 28}_1 ∧  b^{40, 28}_0 ∧ true) 
c  in CNF:
c     b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ false 
c  in DIMACS:
 16133 -16134 -16135  0
c  -3 does not represent an automaton state.
c    -( b^{40, 28}_2 ∧  b^{40, 28}_1 ∧  b^{40, 28}_0 ∧ true) 
c  in CNF:
c    -b^{40, 28}_2 ∨ -b^{40, 28}_1 ∨ -b^{40, 28}_0 ∨ false 
c  in DIMACS:
-16133 -16134 -16135  0

c i = 29
c  -2+1 --> -1
c    ( b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧  p_1160) -> ( b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧  b^{40, 30}_0)
c  in CNF:
c    -b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨  b^{40, 30}_2
c    -b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_1
c    -b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨  b^{40, 30}_0
c  in DIMACS:
-16136 -16137  16138 -1160  16139 0
-16136 -16137  16138 -1160 -16140 0
-16136 -16137  16138 -1160  16141 0

c  -1+1 --> 0
c    ( b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0 ∧  p_1160) -> (-b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧ -b^{40, 30}_0)
c  in CNF:
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_2
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_1
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_0
c  in DIMACS:
-16136  16137 -16138 -1160 -16139 0
-16136  16137 -16138 -1160 -16140 0
-16136  16137 -16138 -1160 -16141 0

c  0+1 --> 1
c    (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧  p_1160) -> (-b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧  b^{40, 30}_0)
c  in CNF:
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_2
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_1
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨  b^{40, 30}_0
c  in DIMACS:
 16136  16137  16138 -1160 -16139 0
 16136  16137  16138 -1160 -16140 0
 16136  16137  16138 -1160  16141 0

c  1+1 --> 2
c    (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0 ∧  p_1160) -> (-b^{40, 30}_2 ∧  b^{40, 30}_1 ∧ -b^{40, 30}_0)
c  in CNF:
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_2
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨  b^{40, 30}_1
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ -p_1160 ∨ -b^{40, 30}_0
c  in DIMACS:
 16136  16137 -16138 -1160 -16139 0
 16136  16137 -16138 -1160  16140 0
 16136  16137 -16138 -1160 -16141 0

c  2+1 --> break 
c    (-b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 16136 -16137  16138 -1160 1162 0


c  2-1 --> 1
c    (-b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧ -p_1160) -> (-b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧  b^{40, 30}_0)
c  in CNF:
c     b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_2
c     b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_1
c     b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨  b^{40, 30}_0
c  in DIMACS:
 16136 -16137  16138  1160 -16139 0
 16136 -16137  16138  1160 -16140 0
 16136 -16137  16138  1160  16141 0

c  1-1 --> 0
c    (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0 ∧ -p_1160) -> (-b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧ -b^{40, 30}_0)
c  in CNF:
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_2
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_1
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_0
c  in DIMACS:
 16136  16137 -16138  1160 -16139 0
 16136  16137 -16138  1160 -16140 0
 16136  16137 -16138  1160 -16141 0

c  0-1 --> -1
c    (-b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧ -p_1160) -> ( b^{40, 30}_2 ∧ -b^{40, 30}_1 ∧  b^{40, 30}_0)
c  in CNF:
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨  b^{40, 30}_2
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_1
c     b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨  b^{40, 30}_0
c  in DIMACS:
 16136  16137  16138  1160  16139 0
 16136  16137  16138  1160 -16140 0
 16136  16137  16138  1160  16141 0

c  -1-1 --> -2
c    ( b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧  b^{40, 29}_0 ∧ -p_1160) -> ( b^{40, 30}_2 ∧  b^{40, 30}_1 ∧ -b^{40, 30}_0)
c  in CNF:
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨  b^{40, 30}_2
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨  b^{40, 30}_1
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨  p_1160 ∨ -b^{40, 30}_0
c  in DIMACS:
-16136  16137 -16138  1160  16139 0
-16136  16137 -16138  1160  16140 0
-16136  16137 -16138  1160 -16141 0

c  -2-1 --> break 
c    ( b^{40, 29}_2 ∧  b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨  b^{40, 29}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-16136 -16137  16138  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{40, 29}_2 ∧ -b^{40, 29}_1 ∧ -b^{40, 29}_0 ∧ true) 
c  in CNF:
c    -b^{40, 29}_2 ∨  b^{40, 29}_1 ∨  b^{40, 29}_0 ∨ false 
c  in DIMACS:
-16136  16137  16138  0

c  3 does not represent an automaton state.
c    -(-b^{40, 29}_2 ∧  b^{40, 29}_1 ∧  b^{40, 29}_0 ∧ true) 
c  in CNF:
c     b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ false 
c  in DIMACS:
 16136 -16137 -16138  0
c  -3 does not represent an automaton state.
c    -( b^{40, 29}_2 ∧  b^{40, 29}_1 ∧  b^{40, 29}_0 ∧ true) 
c  in CNF:
c    -b^{40, 29}_2 ∨ -b^{40, 29}_1 ∨ -b^{40, 29}_0 ∨ false 
c  in DIMACS:
-16136 -16137 -16138  0

c INIT for k = 41
c    -b^{41, 1}_2
c    -b^{41, 1}_1
c    -b^{41, 1}_0
c  in DIMACS:
-16142 0
-16143 0
-16144 0

c Transitions for k = 41
c i = 1
c  -2+1 --> -1
c    ( b^{41, 1}_2 ∧  b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧  p_41) -> ( b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0)
c  in CNF:
c    -b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨  b^{41, 2}_2
c    -b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_1
c    -b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨  b^{41, 2}_0
c  in DIMACS:
-16142 -16143  16144 -41  16145 0
-16142 -16143  16144 -41 -16146 0
-16142 -16143  16144 -41  16147 0

c  -1+1 --> 0
c    ( b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧  b^{41, 1}_0 ∧  p_41) -> (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧ -b^{41, 2}_0)
c  in CNF:
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_2
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_1
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_0
c  in DIMACS:
-16142  16143 -16144 -41 -16145 0
-16142  16143 -16144 -41 -16146 0
-16142  16143 -16144 -41 -16147 0

c  0+1 --> 1
c    (-b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧  p_41) -> (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0)
c  in CNF:
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_2
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_1
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨  b^{41, 2}_0
c  in DIMACS:
 16142  16143  16144 -41 -16145 0
 16142  16143  16144 -41 -16146 0
 16142  16143  16144 -41  16147 0

c  1+1 --> 2
c    (-b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧  b^{41, 1}_0 ∧  p_41) -> (-b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0)
c  in CNF:
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_2
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨  b^{41, 2}_1
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ -p_41 ∨ -b^{41, 2}_0
c  in DIMACS:
 16142  16143 -16144 -41 -16145 0
 16142  16143 -16144 -41  16146 0
 16142  16143 -16144 -41 -16147 0

c  2+1 --> break 
c    (-b^{41, 1}_2 ∧  b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧  p_41) -> break
c  in CNF:
c     b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ -p_41 ∨ break
c  in DIMACS:
 16142 -16143  16144 -41 1162 0


c  2-1 --> 1
c    (-b^{41, 1}_2 ∧  b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧ -p_41) -> (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0)
c  in CNF:
c     b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_2
c     b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_1
c     b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨  b^{41, 2}_0
c  in DIMACS:
 16142 -16143  16144  41 -16145 0
 16142 -16143  16144  41 -16146 0
 16142 -16143  16144  41  16147 0

c  1-1 --> 0
c    (-b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧  b^{41, 1}_0 ∧ -p_41) -> (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧ -b^{41, 2}_0)
c  in CNF:
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_2
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_1
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_0
c  in DIMACS:
 16142  16143 -16144  41 -16145 0
 16142  16143 -16144  41 -16146 0
 16142  16143 -16144  41 -16147 0

c  0-1 --> -1
c    (-b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧ -p_41) -> ( b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0)
c  in CNF:
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨  b^{41, 2}_2
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_1
c     b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨  b^{41, 2}_0
c  in DIMACS:
 16142  16143  16144  41  16145 0
 16142  16143  16144  41 -16146 0
 16142  16143  16144  41  16147 0

c  -1-1 --> -2
c    ( b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧  b^{41, 1}_0 ∧ -p_41) -> ( b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0)
c  in CNF:
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨  b^{41, 2}_2
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨  b^{41, 2}_1
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨  p_41 ∨ -b^{41, 2}_0
c  in DIMACS:
-16142  16143 -16144  41  16145 0
-16142  16143 -16144  41  16146 0
-16142  16143 -16144  41 -16147 0

c  -2-1 --> break 
c    ( b^{41, 1}_2 ∧  b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧ -p_41) -> break
c  in CNF:
c    -b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨  b^{41, 1}_0 ∨  p_41 ∨ break
c  in DIMACS:
-16142 -16143  16144  41 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 1}_2 ∧ -b^{41, 1}_1 ∧ -b^{41, 1}_0 ∧ true) 
c  in CNF:
c    -b^{41, 1}_2 ∨  b^{41, 1}_1 ∨  b^{41, 1}_0 ∨ false 
c  in DIMACS:
-16142  16143  16144  0

c  3 does not represent an automaton state.
c    -(-b^{41, 1}_2 ∧  b^{41, 1}_1 ∧  b^{41, 1}_0 ∧ true) 
c  in CNF:
c     b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ false 
c  in DIMACS:
 16142 -16143 -16144  0
c  -3 does not represent an automaton state.
c    -( b^{41, 1}_2 ∧  b^{41, 1}_1 ∧  b^{41, 1}_0 ∧ true) 
c  in CNF:
c    -b^{41, 1}_2 ∨ -b^{41, 1}_1 ∨ -b^{41, 1}_0 ∨ false 
c  in DIMACS:
-16142 -16143 -16144  0

c i = 2
c  -2+1 --> -1
c    ( b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧  p_82) -> ( b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0)
c  in CNF:
c    -b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨  b^{41, 3}_2
c    -b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_1
c    -b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨  b^{41, 3}_0
c  in DIMACS:
-16145 -16146  16147 -82  16148 0
-16145 -16146  16147 -82 -16149 0
-16145 -16146  16147 -82  16150 0

c  -1+1 --> 0
c    ( b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0 ∧  p_82) -> (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧ -b^{41, 3}_0)
c  in CNF:
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_2
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_1
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_0
c  in DIMACS:
-16145  16146 -16147 -82 -16148 0
-16145  16146 -16147 -82 -16149 0
-16145  16146 -16147 -82 -16150 0

c  0+1 --> 1
c    (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧  p_82) -> (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0)
c  in CNF:
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_2
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_1
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨  b^{41, 3}_0
c  in DIMACS:
 16145  16146  16147 -82 -16148 0
 16145  16146  16147 -82 -16149 0
 16145  16146  16147 -82  16150 0

c  1+1 --> 2
c    (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0 ∧  p_82) -> (-b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0)
c  in CNF:
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_2
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨  b^{41, 3}_1
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ -p_82 ∨ -b^{41, 3}_0
c  in DIMACS:
 16145  16146 -16147 -82 -16148 0
 16145  16146 -16147 -82  16149 0
 16145  16146 -16147 -82 -16150 0

c  2+1 --> break 
c    (-b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧  p_82) -> break
c  in CNF:
c     b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ -p_82 ∨ break
c  in DIMACS:
 16145 -16146  16147 -82 1162 0


c  2-1 --> 1
c    (-b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧ -p_82) -> (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0)
c  in CNF:
c     b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_2
c     b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_1
c     b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨  b^{41, 3}_0
c  in DIMACS:
 16145 -16146  16147  82 -16148 0
 16145 -16146  16147  82 -16149 0
 16145 -16146  16147  82  16150 0

c  1-1 --> 0
c    (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0 ∧ -p_82) -> (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧ -b^{41, 3}_0)
c  in CNF:
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_2
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_1
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_0
c  in DIMACS:
 16145  16146 -16147  82 -16148 0
 16145  16146 -16147  82 -16149 0
 16145  16146 -16147  82 -16150 0

c  0-1 --> -1
c    (-b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧ -p_82) -> ( b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0)
c  in CNF:
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨  b^{41, 3}_2
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_1
c     b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨  b^{41, 3}_0
c  in DIMACS:
 16145  16146  16147  82  16148 0
 16145  16146  16147  82 -16149 0
 16145  16146  16147  82  16150 0

c  -1-1 --> -2
c    ( b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧  b^{41, 2}_0 ∧ -p_82) -> ( b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0)
c  in CNF:
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨  b^{41, 3}_2
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨  b^{41, 3}_1
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨  p_82 ∨ -b^{41, 3}_0
c  in DIMACS:
-16145  16146 -16147  82  16148 0
-16145  16146 -16147  82  16149 0
-16145  16146 -16147  82 -16150 0

c  -2-1 --> break 
c    ( b^{41, 2}_2 ∧  b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧ -p_82) -> break
c  in CNF:
c    -b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨  b^{41, 2}_0 ∨  p_82 ∨ break
c  in DIMACS:
-16145 -16146  16147  82 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 2}_2 ∧ -b^{41, 2}_1 ∧ -b^{41, 2}_0 ∧ true) 
c  in CNF:
c    -b^{41, 2}_2 ∨  b^{41, 2}_1 ∨  b^{41, 2}_0 ∨ false 
c  in DIMACS:
-16145  16146  16147  0

c  3 does not represent an automaton state.
c    -(-b^{41, 2}_2 ∧  b^{41, 2}_1 ∧  b^{41, 2}_0 ∧ true) 
c  in CNF:
c     b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ false 
c  in DIMACS:
 16145 -16146 -16147  0
c  -3 does not represent an automaton state.
c    -( b^{41, 2}_2 ∧  b^{41, 2}_1 ∧  b^{41, 2}_0 ∧ true) 
c  in CNF:
c    -b^{41, 2}_2 ∨ -b^{41, 2}_1 ∨ -b^{41, 2}_0 ∨ false 
c  in DIMACS:
-16145 -16146 -16147  0

c i = 3
c  -2+1 --> -1
c    ( b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧  p_123) -> ( b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0)
c  in CNF:
c    -b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨  b^{41, 4}_2
c    -b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_1
c    -b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨  b^{41, 4}_0
c  in DIMACS:
-16148 -16149  16150 -123  16151 0
-16148 -16149  16150 -123 -16152 0
-16148 -16149  16150 -123  16153 0

c  -1+1 --> 0
c    ( b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0 ∧  p_123) -> (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧ -b^{41, 4}_0)
c  in CNF:
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_2
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_1
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_0
c  in DIMACS:
-16148  16149 -16150 -123 -16151 0
-16148  16149 -16150 -123 -16152 0
-16148  16149 -16150 -123 -16153 0

c  0+1 --> 1
c    (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧  p_123) -> (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0)
c  in CNF:
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_2
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_1
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨  b^{41, 4}_0
c  in DIMACS:
 16148  16149  16150 -123 -16151 0
 16148  16149  16150 -123 -16152 0
 16148  16149  16150 -123  16153 0

c  1+1 --> 2
c    (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0 ∧  p_123) -> (-b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0)
c  in CNF:
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_2
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨  b^{41, 4}_1
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ -p_123 ∨ -b^{41, 4}_0
c  in DIMACS:
 16148  16149 -16150 -123 -16151 0
 16148  16149 -16150 -123  16152 0
 16148  16149 -16150 -123 -16153 0

c  2+1 --> break 
c    (-b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧  p_123) -> break
c  in CNF:
c     b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ -p_123 ∨ break
c  in DIMACS:
 16148 -16149  16150 -123 1162 0


c  2-1 --> 1
c    (-b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧ -p_123) -> (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0)
c  in CNF:
c     b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_2
c     b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_1
c     b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨  b^{41, 4}_0
c  in DIMACS:
 16148 -16149  16150  123 -16151 0
 16148 -16149  16150  123 -16152 0
 16148 -16149  16150  123  16153 0

c  1-1 --> 0
c    (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0 ∧ -p_123) -> (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧ -b^{41, 4}_0)
c  in CNF:
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_2
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_1
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_0
c  in DIMACS:
 16148  16149 -16150  123 -16151 0
 16148  16149 -16150  123 -16152 0
 16148  16149 -16150  123 -16153 0

c  0-1 --> -1
c    (-b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧ -p_123) -> ( b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0)
c  in CNF:
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨  b^{41, 4}_2
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_1
c     b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨  b^{41, 4}_0
c  in DIMACS:
 16148  16149  16150  123  16151 0
 16148  16149  16150  123 -16152 0
 16148  16149  16150  123  16153 0

c  -1-1 --> -2
c    ( b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧  b^{41, 3}_0 ∧ -p_123) -> ( b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0)
c  in CNF:
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨  b^{41, 4}_2
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨  b^{41, 4}_1
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨  p_123 ∨ -b^{41, 4}_0
c  in DIMACS:
-16148  16149 -16150  123  16151 0
-16148  16149 -16150  123  16152 0
-16148  16149 -16150  123 -16153 0

c  -2-1 --> break 
c    ( b^{41, 3}_2 ∧  b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧ -p_123) -> break
c  in CNF:
c    -b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨  b^{41, 3}_0 ∨  p_123 ∨ break
c  in DIMACS:
-16148 -16149  16150  123 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 3}_2 ∧ -b^{41, 3}_1 ∧ -b^{41, 3}_0 ∧ true) 
c  in CNF:
c    -b^{41, 3}_2 ∨  b^{41, 3}_1 ∨  b^{41, 3}_0 ∨ false 
c  in DIMACS:
-16148  16149  16150  0

c  3 does not represent an automaton state.
c    -(-b^{41, 3}_2 ∧  b^{41, 3}_1 ∧  b^{41, 3}_0 ∧ true) 
c  in CNF:
c     b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ false 
c  in DIMACS:
 16148 -16149 -16150  0
c  -3 does not represent an automaton state.
c    -( b^{41, 3}_2 ∧  b^{41, 3}_1 ∧  b^{41, 3}_0 ∧ true) 
c  in CNF:
c    -b^{41, 3}_2 ∨ -b^{41, 3}_1 ∨ -b^{41, 3}_0 ∨ false 
c  in DIMACS:
-16148 -16149 -16150  0

c i = 4
c  -2+1 --> -1
c    ( b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧  p_164) -> ( b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0)
c  in CNF:
c    -b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨  b^{41, 5}_2
c    -b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_1
c    -b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨  b^{41, 5}_0
c  in DIMACS:
-16151 -16152  16153 -164  16154 0
-16151 -16152  16153 -164 -16155 0
-16151 -16152  16153 -164  16156 0

c  -1+1 --> 0
c    ( b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0 ∧  p_164) -> (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧ -b^{41, 5}_0)
c  in CNF:
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_2
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_1
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_0
c  in DIMACS:
-16151  16152 -16153 -164 -16154 0
-16151  16152 -16153 -164 -16155 0
-16151  16152 -16153 -164 -16156 0

c  0+1 --> 1
c    (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧  p_164) -> (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0)
c  in CNF:
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_2
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_1
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨  b^{41, 5}_0
c  in DIMACS:
 16151  16152  16153 -164 -16154 0
 16151  16152  16153 -164 -16155 0
 16151  16152  16153 -164  16156 0

c  1+1 --> 2
c    (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0 ∧  p_164) -> (-b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0)
c  in CNF:
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_2
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨  b^{41, 5}_1
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ -p_164 ∨ -b^{41, 5}_0
c  in DIMACS:
 16151  16152 -16153 -164 -16154 0
 16151  16152 -16153 -164  16155 0
 16151  16152 -16153 -164 -16156 0

c  2+1 --> break 
c    (-b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧  p_164) -> break
c  in CNF:
c     b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 16151 -16152  16153 -164 1162 0


c  2-1 --> 1
c    (-b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧ -p_164) -> (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0)
c  in CNF:
c     b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_2
c     b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_1
c     b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨  b^{41, 5}_0
c  in DIMACS:
 16151 -16152  16153  164 -16154 0
 16151 -16152  16153  164 -16155 0
 16151 -16152  16153  164  16156 0

c  1-1 --> 0
c    (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0 ∧ -p_164) -> (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧ -b^{41, 5}_0)
c  in CNF:
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_2
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_1
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_0
c  in DIMACS:
 16151  16152 -16153  164 -16154 0
 16151  16152 -16153  164 -16155 0
 16151  16152 -16153  164 -16156 0

c  0-1 --> -1
c    (-b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧ -p_164) -> ( b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0)
c  in CNF:
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨  b^{41, 5}_2
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_1
c     b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨  b^{41, 5}_0
c  in DIMACS:
 16151  16152  16153  164  16154 0
 16151  16152  16153  164 -16155 0
 16151  16152  16153  164  16156 0

c  -1-1 --> -2
c    ( b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧  b^{41, 4}_0 ∧ -p_164) -> ( b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0)
c  in CNF:
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨  b^{41, 5}_2
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨  b^{41, 5}_1
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨  p_164 ∨ -b^{41, 5}_0
c  in DIMACS:
-16151  16152 -16153  164  16154 0
-16151  16152 -16153  164  16155 0
-16151  16152 -16153  164 -16156 0

c  -2-1 --> break 
c    ( b^{41, 4}_2 ∧  b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨  b^{41, 4}_0 ∨  p_164 ∨ break
c  in DIMACS:
-16151 -16152  16153  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 4}_2 ∧ -b^{41, 4}_1 ∧ -b^{41, 4}_0 ∧ true) 
c  in CNF:
c    -b^{41, 4}_2 ∨  b^{41, 4}_1 ∨  b^{41, 4}_0 ∨ false 
c  in DIMACS:
-16151  16152  16153  0

c  3 does not represent an automaton state.
c    -(-b^{41, 4}_2 ∧  b^{41, 4}_1 ∧  b^{41, 4}_0 ∧ true) 
c  in CNF:
c     b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ false 
c  in DIMACS:
 16151 -16152 -16153  0
c  -3 does not represent an automaton state.
c    -( b^{41, 4}_2 ∧  b^{41, 4}_1 ∧  b^{41, 4}_0 ∧ true) 
c  in CNF:
c    -b^{41, 4}_2 ∨ -b^{41, 4}_1 ∨ -b^{41, 4}_0 ∨ false 
c  in DIMACS:
-16151 -16152 -16153  0

c i = 5
c  -2+1 --> -1
c    ( b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧  p_205) -> ( b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0)
c  in CNF:
c    -b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨  b^{41, 6}_2
c    -b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_1
c    -b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨  b^{41, 6}_0
c  in DIMACS:
-16154 -16155  16156 -205  16157 0
-16154 -16155  16156 -205 -16158 0
-16154 -16155  16156 -205  16159 0

c  -1+1 --> 0
c    ( b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0 ∧  p_205) -> (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧ -b^{41, 6}_0)
c  in CNF:
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_2
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_1
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_0
c  in DIMACS:
-16154  16155 -16156 -205 -16157 0
-16154  16155 -16156 -205 -16158 0
-16154  16155 -16156 -205 -16159 0

c  0+1 --> 1
c    (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧  p_205) -> (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0)
c  in CNF:
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_2
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_1
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨  b^{41, 6}_0
c  in DIMACS:
 16154  16155  16156 -205 -16157 0
 16154  16155  16156 -205 -16158 0
 16154  16155  16156 -205  16159 0

c  1+1 --> 2
c    (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0 ∧  p_205) -> (-b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0)
c  in CNF:
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_2
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨  b^{41, 6}_1
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ -p_205 ∨ -b^{41, 6}_0
c  in DIMACS:
 16154  16155 -16156 -205 -16157 0
 16154  16155 -16156 -205  16158 0
 16154  16155 -16156 -205 -16159 0

c  2+1 --> break 
c    (-b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧  p_205) -> break
c  in CNF:
c     b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ -p_205 ∨ break
c  in DIMACS:
 16154 -16155  16156 -205 1162 0


c  2-1 --> 1
c    (-b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧ -p_205) -> (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0)
c  in CNF:
c     b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_2
c     b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_1
c     b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨  b^{41, 6}_0
c  in DIMACS:
 16154 -16155  16156  205 -16157 0
 16154 -16155  16156  205 -16158 0
 16154 -16155  16156  205  16159 0

c  1-1 --> 0
c    (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0 ∧ -p_205) -> (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧ -b^{41, 6}_0)
c  in CNF:
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_2
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_1
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_0
c  in DIMACS:
 16154  16155 -16156  205 -16157 0
 16154  16155 -16156  205 -16158 0
 16154  16155 -16156  205 -16159 0

c  0-1 --> -1
c    (-b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧ -p_205) -> ( b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0)
c  in CNF:
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨  b^{41, 6}_2
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_1
c     b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨  b^{41, 6}_0
c  in DIMACS:
 16154  16155  16156  205  16157 0
 16154  16155  16156  205 -16158 0
 16154  16155  16156  205  16159 0

c  -1-1 --> -2
c    ( b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧  b^{41, 5}_0 ∧ -p_205) -> ( b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0)
c  in CNF:
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨  b^{41, 6}_2
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨  b^{41, 6}_1
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨  p_205 ∨ -b^{41, 6}_0
c  in DIMACS:
-16154  16155 -16156  205  16157 0
-16154  16155 -16156  205  16158 0
-16154  16155 -16156  205 -16159 0

c  -2-1 --> break 
c    ( b^{41, 5}_2 ∧  b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧ -p_205) -> break
c  in CNF:
c    -b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨  b^{41, 5}_0 ∨  p_205 ∨ break
c  in DIMACS:
-16154 -16155  16156  205 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 5}_2 ∧ -b^{41, 5}_1 ∧ -b^{41, 5}_0 ∧ true) 
c  in CNF:
c    -b^{41, 5}_2 ∨  b^{41, 5}_1 ∨  b^{41, 5}_0 ∨ false 
c  in DIMACS:
-16154  16155  16156  0

c  3 does not represent an automaton state.
c    -(-b^{41, 5}_2 ∧  b^{41, 5}_1 ∧  b^{41, 5}_0 ∧ true) 
c  in CNF:
c     b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ false 
c  in DIMACS:
 16154 -16155 -16156  0
c  -3 does not represent an automaton state.
c    -( b^{41, 5}_2 ∧  b^{41, 5}_1 ∧  b^{41, 5}_0 ∧ true) 
c  in CNF:
c    -b^{41, 5}_2 ∨ -b^{41, 5}_1 ∨ -b^{41, 5}_0 ∨ false 
c  in DIMACS:
-16154 -16155 -16156  0

c i = 6
c  -2+1 --> -1
c    ( b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧  p_246) -> ( b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0)
c  in CNF:
c    -b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨  b^{41, 7}_2
c    -b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_1
c    -b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨  b^{41, 7}_0
c  in DIMACS:
-16157 -16158  16159 -246  16160 0
-16157 -16158  16159 -246 -16161 0
-16157 -16158  16159 -246  16162 0

c  -1+1 --> 0
c    ( b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0 ∧  p_246) -> (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧ -b^{41, 7}_0)
c  in CNF:
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_2
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_1
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_0
c  in DIMACS:
-16157  16158 -16159 -246 -16160 0
-16157  16158 -16159 -246 -16161 0
-16157  16158 -16159 -246 -16162 0

c  0+1 --> 1
c    (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧  p_246) -> (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0)
c  in CNF:
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_2
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_1
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨  b^{41, 7}_0
c  in DIMACS:
 16157  16158  16159 -246 -16160 0
 16157  16158  16159 -246 -16161 0
 16157  16158  16159 -246  16162 0

c  1+1 --> 2
c    (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0 ∧  p_246) -> (-b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0)
c  in CNF:
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_2
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨  b^{41, 7}_1
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ -p_246 ∨ -b^{41, 7}_0
c  in DIMACS:
 16157  16158 -16159 -246 -16160 0
 16157  16158 -16159 -246  16161 0
 16157  16158 -16159 -246 -16162 0

c  2+1 --> break 
c    (-b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧  p_246) -> break
c  in CNF:
c     b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 16157 -16158  16159 -246 1162 0


c  2-1 --> 1
c    (-b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧ -p_246) -> (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0)
c  in CNF:
c     b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_2
c     b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_1
c     b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨  b^{41, 7}_0
c  in DIMACS:
 16157 -16158  16159  246 -16160 0
 16157 -16158  16159  246 -16161 0
 16157 -16158  16159  246  16162 0

c  1-1 --> 0
c    (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0 ∧ -p_246) -> (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧ -b^{41, 7}_0)
c  in CNF:
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_2
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_1
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_0
c  in DIMACS:
 16157  16158 -16159  246 -16160 0
 16157  16158 -16159  246 -16161 0
 16157  16158 -16159  246 -16162 0

c  0-1 --> -1
c    (-b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧ -p_246) -> ( b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0)
c  in CNF:
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨  b^{41, 7}_2
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_1
c     b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨  b^{41, 7}_0
c  in DIMACS:
 16157  16158  16159  246  16160 0
 16157  16158  16159  246 -16161 0
 16157  16158  16159  246  16162 0

c  -1-1 --> -2
c    ( b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧  b^{41, 6}_0 ∧ -p_246) -> ( b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0)
c  in CNF:
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨  b^{41, 7}_2
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨  b^{41, 7}_1
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨  p_246 ∨ -b^{41, 7}_0
c  in DIMACS:
-16157  16158 -16159  246  16160 0
-16157  16158 -16159  246  16161 0
-16157  16158 -16159  246 -16162 0

c  -2-1 --> break 
c    ( b^{41, 6}_2 ∧  b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨  b^{41, 6}_0 ∨  p_246 ∨ break
c  in DIMACS:
-16157 -16158  16159  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 6}_2 ∧ -b^{41, 6}_1 ∧ -b^{41, 6}_0 ∧ true) 
c  in CNF:
c    -b^{41, 6}_2 ∨  b^{41, 6}_1 ∨  b^{41, 6}_0 ∨ false 
c  in DIMACS:
-16157  16158  16159  0

c  3 does not represent an automaton state.
c    -(-b^{41, 6}_2 ∧  b^{41, 6}_1 ∧  b^{41, 6}_0 ∧ true) 
c  in CNF:
c     b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ false 
c  in DIMACS:
 16157 -16158 -16159  0
c  -3 does not represent an automaton state.
c    -( b^{41, 6}_2 ∧  b^{41, 6}_1 ∧  b^{41, 6}_0 ∧ true) 
c  in CNF:
c    -b^{41, 6}_2 ∨ -b^{41, 6}_1 ∨ -b^{41, 6}_0 ∨ false 
c  in DIMACS:
-16157 -16158 -16159  0

c i = 7
c  -2+1 --> -1
c    ( b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧  p_287) -> ( b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0)
c  in CNF:
c    -b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨  b^{41, 8}_2
c    -b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_1
c    -b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨  b^{41, 8}_0
c  in DIMACS:
-16160 -16161  16162 -287  16163 0
-16160 -16161  16162 -287 -16164 0
-16160 -16161  16162 -287  16165 0

c  -1+1 --> 0
c    ( b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0 ∧  p_287) -> (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧ -b^{41, 8}_0)
c  in CNF:
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_2
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_1
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_0
c  in DIMACS:
-16160  16161 -16162 -287 -16163 0
-16160  16161 -16162 -287 -16164 0
-16160  16161 -16162 -287 -16165 0

c  0+1 --> 1
c    (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧  p_287) -> (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0)
c  in CNF:
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_2
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_1
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨  b^{41, 8}_0
c  in DIMACS:
 16160  16161  16162 -287 -16163 0
 16160  16161  16162 -287 -16164 0
 16160  16161  16162 -287  16165 0

c  1+1 --> 2
c    (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0 ∧  p_287) -> (-b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0)
c  in CNF:
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_2
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨  b^{41, 8}_1
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ -p_287 ∨ -b^{41, 8}_0
c  in DIMACS:
 16160  16161 -16162 -287 -16163 0
 16160  16161 -16162 -287  16164 0
 16160  16161 -16162 -287 -16165 0

c  2+1 --> break 
c    (-b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧  p_287) -> break
c  in CNF:
c     b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ -p_287 ∨ break
c  in DIMACS:
 16160 -16161  16162 -287 1162 0


c  2-1 --> 1
c    (-b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧ -p_287) -> (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0)
c  in CNF:
c     b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_2
c     b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_1
c     b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨  b^{41, 8}_0
c  in DIMACS:
 16160 -16161  16162  287 -16163 0
 16160 -16161  16162  287 -16164 0
 16160 -16161  16162  287  16165 0

c  1-1 --> 0
c    (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0 ∧ -p_287) -> (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧ -b^{41, 8}_0)
c  in CNF:
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_2
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_1
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_0
c  in DIMACS:
 16160  16161 -16162  287 -16163 0
 16160  16161 -16162  287 -16164 0
 16160  16161 -16162  287 -16165 0

c  0-1 --> -1
c    (-b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧ -p_287) -> ( b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0)
c  in CNF:
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨  b^{41, 8}_2
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_1
c     b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨  b^{41, 8}_0
c  in DIMACS:
 16160  16161  16162  287  16163 0
 16160  16161  16162  287 -16164 0
 16160  16161  16162  287  16165 0

c  -1-1 --> -2
c    ( b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧  b^{41, 7}_0 ∧ -p_287) -> ( b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0)
c  in CNF:
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨  b^{41, 8}_2
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨  b^{41, 8}_1
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨  p_287 ∨ -b^{41, 8}_0
c  in DIMACS:
-16160  16161 -16162  287  16163 0
-16160  16161 -16162  287  16164 0
-16160  16161 -16162  287 -16165 0

c  -2-1 --> break 
c    ( b^{41, 7}_2 ∧  b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧ -p_287) -> break
c  in CNF:
c    -b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨  b^{41, 7}_0 ∨  p_287 ∨ break
c  in DIMACS:
-16160 -16161  16162  287 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 7}_2 ∧ -b^{41, 7}_1 ∧ -b^{41, 7}_0 ∧ true) 
c  in CNF:
c    -b^{41, 7}_2 ∨  b^{41, 7}_1 ∨  b^{41, 7}_0 ∨ false 
c  in DIMACS:
-16160  16161  16162  0

c  3 does not represent an automaton state.
c    -(-b^{41, 7}_2 ∧  b^{41, 7}_1 ∧  b^{41, 7}_0 ∧ true) 
c  in CNF:
c     b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ false 
c  in DIMACS:
 16160 -16161 -16162  0
c  -3 does not represent an automaton state.
c    -( b^{41, 7}_2 ∧  b^{41, 7}_1 ∧  b^{41, 7}_0 ∧ true) 
c  in CNF:
c    -b^{41, 7}_2 ∨ -b^{41, 7}_1 ∨ -b^{41, 7}_0 ∨ false 
c  in DIMACS:
-16160 -16161 -16162  0

c i = 8
c  -2+1 --> -1
c    ( b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧  p_328) -> ( b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0)
c  in CNF:
c    -b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨  b^{41, 9}_2
c    -b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_1
c    -b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨  b^{41, 9}_0
c  in DIMACS:
-16163 -16164  16165 -328  16166 0
-16163 -16164  16165 -328 -16167 0
-16163 -16164  16165 -328  16168 0

c  -1+1 --> 0
c    ( b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0 ∧  p_328) -> (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧ -b^{41, 9}_0)
c  in CNF:
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_2
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_1
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_0
c  in DIMACS:
-16163  16164 -16165 -328 -16166 0
-16163  16164 -16165 -328 -16167 0
-16163  16164 -16165 -328 -16168 0

c  0+1 --> 1
c    (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧  p_328) -> (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0)
c  in CNF:
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_2
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_1
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨  b^{41, 9}_0
c  in DIMACS:
 16163  16164  16165 -328 -16166 0
 16163  16164  16165 -328 -16167 0
 16163  16164  16165 -328  16168 0

c  1+1 --> 2
c    (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0 ∧  p_328) -> (-b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0)
c  in CNF:
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_2
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨  b^{41, 9}_1
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ -p_328 ∨ -b^{41, 9}_0
c  in DIMACS:
 16163  16164 -16165 -328 -16166 0
 16163  16164 -16165 -328  16167 0
 16163  16164 -16165 -328 -16168 0

c  2+1 --> break 
c    (-b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧  p_328) -> break
c  in CNF:
c     b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 16163 -16164  16165 -328 1162 0


c  2-1 --> 1
c    (-b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧ -p_328) -> (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0)
c  in CNF:
c     b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_2
c     b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_1
c     b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨  b^{41, 9}_0
c  in DIMACS:
 16163 -16164  16165  328 -16166 0
 16163 -16164  16165  328 -16167 0
 16163 -16164  16165  328  16168 0

c  1-1 --> 0
c    (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0 ∧ -p_328) -> (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧ -b^{41, 9}_0)
c  in CNF:
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_2
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_1
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_0
c  in DIMACS:
 16163  16164 -16165  328 -16166 0
 16163  16164 -16165  328 -16167 0
 16163  16164 -16165  328 -16168 0

c  0-1 --> -1
c    (-b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧ -p_328) -> ( b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0)
c  in CNF:
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨  b^{41, 9}_2
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_1
c     b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨  b^{41, 9}_0
c  in DIMACS:
 16163  16164  16165  328  16166 0
 16163  16164  16165  328 -16167 0
 16163  16164  16165  328  16168 0

c  -1-1 --> -2
c    ( b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧  b^{41, 8}_0 ∧ -p_328) -> ( b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0)
c  in CNF:
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨  b^{41, 9}_2
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨  b^{41, 9}_1
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨  p_328 ∨ -b^{41, 9}_0
c  in DIMACS:
-16163  16164 -16165  328  16166 0
-16163  16164 -16165  328  16167 0
-16163  16164 -16165  328 -16168 0

c  -2-1 --> break 
c    ( b^{41, 8}_2 ∧  b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨  b^{41, 8}_0 ∨  p_328 ∨ break
c  in DIMACS:
-16163 -16164  16165  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 8}_2 ∧ -b^{41, 8}_1 ∧ -b^{41, 8}_0 ∧ true) 
c  in CNF:
c    -b^{41, 8}_2 ∨  b^{41, 8}_1 ∨  b^{41, 8}_0 ∨ false 
c  in DIMACS:
-16163  16164  16165  0

c  3 does not represent an automaton state.
c    -(-b^{41, 8}_2 ∧  b^{41, 8}_1 ∧  b^{41, 8}_0 ∧ true) 
c  in CNF:
c     b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ false 
c  in DIMACS:
 16163 -16164 -16165  0
c  -3 does not represent an automaton state.
c    -( b^{41, 8}_2 ∧  b^{41, 8}_1 ∧  b^{41, 8}_0 ∧ true) 
c  in CNF:
c    -b^{41, 8}_2 ∨ -b^{41, 8}_1 ∨ -b^{41, 8}_0 ∨ false 
c  in DIMACS:
-16163 -16164 -16165  0

c i = 9
c  -2+1 --> -1
c    ( b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧  p_369) -> ( b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0)
c  in CNF:
c    -b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨  b^{41, 10}_2
c    -b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_1
c    -b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨  b^{41, 10}_0
c  in DIMACS:
-16166 -16167  16168 -369  16169 0
-16166 -16167  16168 -369 -16170 0
-16166 -16167  16168 -369  16171 0

c  -1+1 --> 0
c    ( b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0 ∧  p_369) -> (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧ -b^{41, 10}_0)
c  in CNF:
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_2
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_1
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_0
c  in DIMACS:
-16166  16167 -16168 -369 -16169 0
-16166  16167 -16168 -369 -16170 0
-16166  16167 -16168 -369 -16171 0

c  0+1 --> 1
c    (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧  p_369) -> (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0)
c  in CNF:
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_2
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_1
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨  b^{41, 10}_0
c  in DIMACS:
 16166  16167  16168 -369 -16169 0
 16166  16167  16168 -369 -16170 0
 16166  16167  16168 -369  16171 0

c  1+1 --> 2
c    (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0 ∧  p_369) -> (-b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0)
c  in CNF:
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_2
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨  b^{41, 10}_1
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ -p_369 ∨ -b^{41, 10}_0
c  in DIMACS:
 16166  16167 -16168 -369 -16169 0
 16166  16167 -16168 -369  16170 0
 16166  16167 -16168 -369 -16171 0

c  2+1 --> break 
c    (-b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧  p_369) -> break
c  in CNF:
c     b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 16166 -16167  16168 -369 1162 0


c  2-1 --> 1
c    (-b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧ -p_369) -> (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0)
c  in CNF:
c     b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_2
c     b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_1
c     b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨  b^{41, 10}_0
c  in DIMACS:
 16166 -16167  16168  369 -16169 0
 16166 -16167  16168  369 -16170 0
 16166 -16167  16168  369  16171 0

c  1-1 --> 0
c    (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0 ∧ -p_369) -> (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧ -b^{41, 10}_0)
c  in CNF:
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_2
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_1
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_0
c  in DIMACS:
 16166  16167 -16168  369 -16169 0
 16166  16167 -16168  369 -16170 0
 16166  16167 -16168  369 -16171 0

c  0-1 --> -1
c    (-b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧ -p_369) -> ( b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0)
c  in CNF:
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨  b^{41, 10}_2
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_1
c     b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨  b^{41, 10}_0
c  in DIMACS:
 16166  16167  16168  369  16169 0
 16166  16167  16168  369 -16170 0
 16166  16167  16168  369  16171 0

c  -1-1 --> -2
c    ( b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧  b^{41, 9}_0 ∧ -p_369) -> ( b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0)
c  in CNF:
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨  b^{41, 10}_2
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨  b^{41, 10}_1
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨  p_369 ∨ -b^{41, 10}_0
c  in DIMACS:
-16166  16167 -16168  369  16169 0
-16166  16167 -16168  369  16170 0
-16166  16167 -16168  369 -16171 0

c  -2-1 --> break 
c    ( b^{41, 9}_2 ∧  b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨  b^{41, 9}_0 ∨  p_369 ∨ break
c  in DIMACS:
-16166 -16167  16168  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 9}_2 ∧ -b^{41, 9}_1 ∧ -b^{41, 9}_0 ∧ true) 
c  in CNF:
c    -b^{41, 9}_2 ∨  b^{41, 9}_1 ∨  b^{41, 9}_0 ∨ false 
c  in DIMACS:
-16166  16167  16168  0

c  3 does not represent an automaton state.
c    -(-b^{41, 9}_2 ∧  b^{41, 9}_1 ∧  b^{41, 9}_0 ∧ true) 
c  in CNF:
c     b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ false 
c  in DIMACS:
 16166 -16167 -16168  0
c  -3 does not represent an automaton state.
c    -( b^{41, 9}_2 ∧  b^{41, 9}_1 ∧  b^{41, 9}_0 ∧ true) 
c  in CNF:
c    -b^{41, 9}_2 ∨ -b^{41, 9}_1 ∨ -b^{41, 9}_0 ∨ false 
c  in DIMACS:
-16166 -16167 -16168  0

c i = 10
c  -2+1 --> -1
c    ( b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧  p_410) -> ( b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0)
c  in CNF:
c    -b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨  b^{41, 11}_2
c    -b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_1
c    -b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨  b^{41, 11}_0
c  in DIMACS:
-16169 -16170  16171 -410  16172 0
-16169 -16170  16171 -410 -16173 0
-16169 -16170  16171 -410  16174 0

c  -1+1 --> 0
c    ( b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0 ∧  p_410) -> (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧ -b^{41, 11}_0)
c  in CNF:
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_2
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_1
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_0
c  in DIMACS:
-16169  16170 -16171 -410 -16172 0
-16169  16170 -16171 -410 -16173 0
-16169  16170 -16171 -410 -16174 0

c  0+1 --> 1
c    (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧  p_410) -> (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0)
c  in CNF:
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_2
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_1
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨  b^{41, 11}_0
c  in DIMACS:
 16169  16170  16171 -410 -16172 0
 16169  16170  16171 -410 -16173 0
 16169  16170  16171 -410  16174 0

c  1+1 --> 2
c    (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0 ∧  p_410) -> (-b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0)
c  in CNF:
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_2
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨  b^{41, 11}_1
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ -p_410 ∨ -b^{41, 11}_0
c  in DIMACS:
 16169  16170 -16171 -410 -16172 0
 16169  16170 -16171 -410  16173 0
 16169  16170 -16171 -410 -16174 0

c  2+1 --> break 
c    (-b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧  p_410) -> break
c  in CNF:
c     b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 16169 -16170  16171 -410 1162 0


c  2-1 --> 1
c    (-b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧ -p_410) -> (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0)
c  in CNF:
c     b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_2
c     b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_1
c     b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨  b^{41, 11}_0
c  in DIMACS:
 16169 -16170  16171  410 -16172 0
 16169 -16170  16171  410 -16173 0
 16169 -16170  16171  410  16174 0

c  1-1 --> 0
c    (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0 ∧ -p_410) -> (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧ -b^{41, 11}_0)
c  in CNF:
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_2
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_1
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_0
c  in DIMACS:
 16169  16170 -16171  410 -16172 0
 16169  16170 -16171  410 -16173 0
 16169  16170 -16171  410 -16174 0

c  0-1 --> -1
c    (-b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧ -p_410) -> ( b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0)
c  in CNF:
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨  b^{41, 11}_2
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_1
c     b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨  b^{41, 11}_0
c  in DIMACS:
 16169  16170  16171  410  16172 0
 16169  16170  16171  410 -16173 0
 16169  16170  16171  410  16174 0

c  -1-1 --> -2
c    ( b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧  b^{41, 10}_0 ∧ -p_410) -> ( b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0)
c  in CNF:
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨  b^{41, 11}_2
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨  b^{41, 11}_1
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨  p_410 ∨ -b^{41, 11}_0
c  in DIMACS:
-16169  16170 -16171  410  16172 0
-16169  16170 -16171  410  16173 0
-16169  16170 -16171  410 -16174 0

c  -2-1 --> break 
c    ( b^{41, 10}_2 ∧  b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨  b^{41, 10}_0 ∨  p_410 ∨ break
c  in DIMACS:
-16169 -16170  16171  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 10}_2 ∧ -b^{41, 10}_1 ∧ -b^{41, 10}_0 ∧ true) 
c  in CNF:
c    -b^{41, 10}_2 ∨  b^{41, 10}_1 ∨  b^{41, 10}_0 ∨ false 
c  in DIMACS:
-16169  16170  16171  0

c  3 does not represent an automaton state.
c    -(-b^{41, 10}_2 ∧  b^{41, 10}_1 ∧  b^{41, 10}_0 ∧ true) 
c  in CNF:
c     b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ false 
c  in DIMACS:
 16169 -16170 -16171  0
c  -3 does not represent an automaton state.
c    -( b^{41, 10}_2 ∧  b^{41, 10}_1 ∧  b^{41, 10}_0 ∧ true) 
c  in CNF:
c    -b^{41, 10}_2 ∨ -b^{41, 10}_1 ∨ -b^{41, 10}_0 ∨ false 
c  in DIMACS:
-16169 -16170 -16171  0

c i = 11
c  -2+1 --> -1
c    ( b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧  p_451) -> ( b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0)
c  in CNF:
c    -b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨  b^{41, 12}_2
c    -b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_1
c    -b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨  b^{41, 12}_0
c  in DIMACS:
-16172 -16173  16174 -451  16175 0
-16172 -16173  16174 -451 -16176 0
-16172 -16173  16174 -451  16177 0

c  -1+1 --> 0
c    ( b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0 ∧  p_451) -> (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧ -b^{41, 12}_0)
c  in CNF:
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_2
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_1
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_0
c  in DIMACS:
-16172  16173 -16174 -451 -16175 0
-16172  16173 -16174 -451 -16176 0
-16172  16173 -16174 -451 -16177 0

c  0+1 --> 1
c    (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧  p_451) -> (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0)
c  in CNF:
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_2
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_1
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨  b^{41, 12}_0
c  in DIMACS:
 16172  16173  16174 -451 -16175 0
 16172  16173  16174 -451 -16176 0
 16172  16173  16174 -451  16177 0

c  1+1 --> 2
c    (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0 ∧  p_451) -> (-b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0)
c  in CNF:
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_2
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨  b^{41, 12}_1
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ -p_451 ∨ -b^{41, 12}_0
c  in DIMACS:
 16172  16173 -16174 -451 -16175 0
 16172  16173 -16174 -451  16176 0
 16172  16173 -16174 -451 -16177 0

c  2+1 --> break 
c    (-b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧  p_451) -> break
c  in CNF:
c     b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ -p_451 ∨ break
c  in DIMACS:
 16172 -16173  16174 -451 1162 0


c  2-1 --> 1
c    (-b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧ -p_451) -> (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0)
c  in CNF:
c     b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_2
c     b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_1
c     b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨  b^{41, 12}_0
c  in DIMACS:
 16172 -16173  16174  451 -16175 0
 16172 -16173  16174  451 -16176 0
 16172 -16173  16174  451  16177 0

c  1-1 --> 0
c    (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0 ∧ -p_451) -> (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧ -b^{41, 12}_0)
c  in CNF:
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_2
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_1
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_0
c  in DIMACS:
 16172  16173 -16174  451 -16175 0
 16172  16173 -16174  451 -16176 0
 16172  16173 -16174  451 -16177 0

c  0-1 --> -1
c    (-b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧ -p_451) -> ( b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0)
c  in CNF:
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨  b^{41, 12}_2
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_1
c     b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨  b^{41, 12}_0
c  in DIMACS:
 16172  16173  16174  451  16175 0
 16172  16173  16174  451 -16176 0
 16172  16173  16174  451  16177 0

c  -1-1 --> -2
c    ( b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧  b^{41, 11}_0 ∧ -p_451) -> ( b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0)
c  in CNF:
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨  b^{41, 12}_2
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨  b^{41, 12}_1
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨  p_451 ∨ -b^{41, 12}_0
c  in DIMACS:
-16172  16173 -16174  451  16175 0
-16172  16173 -16174  451  16176 0
-16172  16173 -16174  451 -16177 0

c  -2-1 --> break 
c    ( b^{41, 11}_2 ∧  b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧ -p_451) -> break
c  in CNF:
c    -b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨  b^{41, 11}_0 ∨  p_451 ∨ break
c  in DIMACS:
-16172 -16173  16174  451 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 11}_2 ∧ -b^{41, 11}_1 ∧ -b^{41, 11}_0 ∧ true) 
c  in CNF:
c    -b^{41, 11}_2 ∨  b^{41, 11}_1 ∨  b^{41, 11}_0 ∨ false 
c  in DIMACS:
-16172  16173  16174  0

c  3 does not represent an automaton state.
c    -(-b^{41, 11}_2 ∧  b^{41, 11}_1 ∧  b^{41, 11}_0 ∧ true) 
c  in CNF:
c     b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ false 
c  in DIMACS:
 16172 -16173 -16174  0
c  -3 does not represent an automaton state.
c    -( b^{41, 11}_2 ∧  b^{41, 11}_1 ∧  b^{41, 11}_0 ∧ true) 
c  in CNF:
c    -b^{41, 11}_2 ∨ -b^{41, 11}_1 ∨ -b^{41, 11}_0 ∨ false 
c  in DIMACS:
-16172 -16173 -16174  0

c i = 12
c  -2+1 --> -1
c    ( b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧  p_492) -> ( b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0)
c  in CNF:
c    -b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨  b^{41, 13}_2
c    -b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_1
c    -b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨  b^{41, 13}_0
c  in DIMACS:
-16175 -16176  16177 -492  16178 0
-16175 -16176  16177 -492 -16179 0
-16175 -16176  16177 -492  16180 0

c  -1+1 --> 0
c    ( b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0 ∧  p_492) -> (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧ -b^{41, 13}_0)
c  in CNF:
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_2
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_1
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_0
c  in DIMACS:
-16175  16176 -16177 -492 -16178 0
-16175  16176 -16177 -492 -16179 0
-16175  16176 -16177 -492 -16180 0

c  0+1 --> 1
c    (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧  p_492) -> (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0)
c  in CNF:
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_2
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_1
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨  b^{41, 13}_0
c  in DIMACS:
 16175  16176  16177 -492 -16178 0
 16175  16176  16177 -492 -16179 0
 16175  16176  16177 -492  16180 0

c  1+1 --> 2
c    (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0 ∧  p_492) -> (-b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0)
c  in CNF:
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_2
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨  b^{41, 13}_1
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ -p_492 ∨ -b^{41, 13}_0
c  in DIMACS:
 16175  16176 -16177 -492 -16178 0
 16175  16176 -16177 -492  16179 0
 16175  16176 -16177 -492 -16180 0

c  2+1 --> break 
c    (-b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧  p_492) -> break
c  in CNF:
c     b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 16175 -16176  16177 -492 1162 0


c  2-1 --> 1
c    (-b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧ -p_492) -> (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0)
c  in CNF:
c     b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_2
c     b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_1
c     b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨  b^{41, 13}_0
c  in DIMACS:
 16175 -16176  16177  492 -16178 0
 16175 -16176  16177  492 -16179 0
 16175 -16176  16177  492  16180 0

c  1-1 --> 0
c    (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0 ∧ -p_492) -> (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧ -b^{41, 13}_0)
c  in CNF:
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_2
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_1
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_0
c  in DIMACS:
 16175  16176 -16177  492 -16178 0
 16175  16176 -16177  492 -16179 0
 16175  16176 -16177  492 -16180 0

c  0-1 --> -1
c    (-b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧ -p_492) -> ( b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0)
c  in CNF:
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨  b^{41, 13}_2
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_1
c     b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨  b^{41, 13}_0
c  in DIMACS:
 16175  16176  16177  492  16178 0
 16175  16176  16177  492 -16179 0
 16175  16176  16177  492  16180 0

c  -1-1 --> -2
c    ( b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧  b^{41, 12}_0 ∧ -p_492) -> ( b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0)
c  in CNF:
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨  b^{41, 13}_2
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨  b^{41, 13}_1
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨  p_492 ∨ -b^{41, 13}_0
c  in DIMACS:
-16175  16176 -16177  492  16178 0
-16175  16176 -16177  492  16179 0
-16175  16176 -16177  492 -16180 0

c  -2-1 --> break 
c    ( b^{41, 12}_2 ∧  b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨  b^{41, 12}_0 ∨  p_492 ∨ break
c  in DIMACS:
-16175 -16176  16177  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 12}_2 ∧ -b^{41, 12}_1 ∧ -b^{41, 12}_0 ∧ true) 
c  in CNF:
c    -b^{41, 12}_2 ∨  b^{41, 12}_1 ∨  b^{41, 12}_0 ∨ false 
c  in DIMACS:
-16175  16176  16177  0

c  3 does not represent an automaton state.
c    -(-b^{41, 12}_2 ∧  b^{41, 12}_1 ∧  b^{41, 12}_0 ∧ true) 
c  in CNF:
c     b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ false 
c  in DIMACS:
 16175 -16176 -16177  0
c  -3 does not represent an automaton state.
c    -( b^{41, 12}_2 ∧  b^{41, 12}_1 ∧  b^{41, 12}_0 ∧ true) 
c  in CNF:
c    -b^{41, 12}_2 ∨ -b^{41, 12}_1 ∨ -b^{41, 12}_0 ∨ false 
c  in DIMACS:
-16175 -16176 -16177  0

c i = 13
c  -2+1 --> -1
c    ( b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧  p_533) -> ( b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0)
c  in CNF:
c    -b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨  b^{41, 14}_2
c    -b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_1
c    -b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨  b^{41, 14}_0
c  in DIMACS:
-16178 -16179  16180 -533  16181 0
-16178 -16179  16180 -533 -16182 0
-16178 -16179  16180 -533  16183 0

c  -1+1 --> 0
c    ( b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0 ∧  p_533) -> (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧ -b^{41, 14}_0)
c  in CNF:
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_2
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_1
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_0
c  in DIMACS:
-16178  16179 -16180 -533 -16181 0
-16178  16179 -16180 -533 -16182 0
-16178  16179 -16180 -533 -16183 0

c  0+1 --> 1
c    (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧  p_533) -> (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0)
c  in CNF:
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_2
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_1
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨  b^{41, 14}_0
c  in DIMACS:
 16178  16179  16180 -533 -16181 0
 16178  16179  16180 -533 -16182 0
 16178  16179  16180 -533  16183 0

c  1+1 --> 2
c    (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0 ∧  p_533) -> (-b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0)
c  in CNF:
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_2
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨  b^{41, 14}_1
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ -p_533 ∨ -b^{41, 14}_0
c  in DIMACS:
 16178  16179 -16180 -533 -16181 0
 16178  16179 -16180 -533  16182 0
 16178  16179 -16180 -533 -16183 0

c  2+1 --> break 
c    (-b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧  p_533) -> break
c  in CNF:
c     b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ -p_533 ∨ break
c  in DIMACS:
 16178 -16179  16180 -533 1162 0


c  2-1 --> 1
c    (-b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧ -p_533) -> (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0)
c  in CNF:
c     b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_2
c     b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_1
c     b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨  b^{41, 14}_0
c  in DIMACS:
 16178 -16179  16180  533 -16181 0
 16178 -16179  16180  533 -16182 0
 16178 -16179  16180  533  16183 0

c  1-1 --> 0
c    (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0 ∧ -p_533) -> (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧ -b^{41, 14}_0)
c  in CNF:
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_2
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_1
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_0
c  in DIMACS:
 16178  16179 -16180  533 -16181 0
 16178  16179 -16180  533 -16182 0
 16178  16179 -16180  533 -16183 0

c  0-1 --> -1
c    (-b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧ -p_533) -> ( b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0)
c  in CNF:
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨  b^{41, 14}_2
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_1
c     b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨  b^{41, 14}_0
c  in DIMACS:
 16178  16179  16180  533  16181 0
 16178  16179  16180  533 -16182 0
 16178  16179  16180  533  16183 0

c  -1-1 --> -2
c    ( b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧  b^{41, 13}_0 ∧ -p_533) -> ( b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0)
c  in CNF:
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨  b^{41, 14}_2
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨  b^{41, 14}_1
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨  p_533 ∨ -b^{41, 14}_0
c  in DIMACS:
-16178  16179 -16180  533  16181 0
-16178  16179 -16180  533  16182 0
-16178  16179 -16180  533 -16183 0

c  -2-1 --> break 
c    ( b^{41, 13}_2 ∧  b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧ -p_533) -> break
c  in CNF:
c    -b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨  b^{41, 13}_0 ∨  p_533 ∨ break
c  in DIMACS:
-16178 -16179  16180  533 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 13}_2 ∧ -b^{41, 13}_1 ∧ -b^{41, 13}_0 ∧ true) 
c  in CNF:
c    -b^{41, 13}_2 ∨  b^{41, 13}_1 ∨  b^{41, 13}_0 ∨ false 
c  in DIMACS:
-16178  16179  16180  0

c  3 does not represent an automaton state.
c    -(-b^{41, 13}_2 ∧  b^{41, 13}_1 ∧  b^{41, 13}_0 ∧ true) 
c  in CNF:
c     b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ false 
c  in DIMACS:
 16178 -16179 -16180  0
c  -3 does not represent an automaton state.
c    -( b^{41, 13}_2 ∧  b^{41, 13}_1 ∧  b^{41, 13}_0 ∧ true) 
c  in CNF:
c    -b^{41, 13}_2 ∨ -b^{41, 13}_1 ∨ -b^{41, 13}_0 ∨ false 
c  in DIMACS:
-16178 -16179 -16180  0

c i = 14
c  -2+1 --> -1
c    ( b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧  p_574) -> ( b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0)
c  in CNF:
c    -b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨  b^{41, 15}_2
c    -b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_1
c    -b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨  b^{41, 15}_0
c  in DIMACS:
-16181 -16182  16183 -574  16184 0
-16181 -16182  16183 -574 -16185 0
-16181 -16182  16183 -574  16186 0

c  -1+1 --> 0
c    ( b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0 ∧  p_574) -> (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧ -b^{41, 15}_0)
c  in CNF:
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_2
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_1
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_0
c  in DIMACS:
-16181  16182 -16183 -574 -16184 0
-16181  16182 -16183 -574 -16185 0
-16181  16182 -16183 -574 -16186 0

c  0+1 --> 1
c    (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧  p_574) -> (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0)
c  in CNF:
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_2
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_1
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨  b^{41, 15}_0
c  in DIMACS:
 16181  16182  16183 -574 -16184 0
 16181  16182  16183 -574 -16185 0
 16181  16182  16183 -574  16186 0

c  1+1 --> 2
c    (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0 ∧  p_574) -> (-b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0)
c  in CNF:
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_2
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨  b^{41, 15}_1
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ -p_574 ∨ -b^{41, 15}_0
c  in DIMACS:
 16181  16182 -16183 -574 -16184 0
 16181  16182 -16183 -574  16185 0
 16181  16182 -16183 -574 -16186 0

c  2+1 --> break 
c    (-b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧  p_574) -> break
c  in CNF:
c     b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 16181 -16182  16183 -574 1162 0


c  2-1 --> 1
c    (-b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧ -p_574) -> (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0)
c  in CNF:
c     b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_2
c     b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_1
c     b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨  b^{41, 15}_0
c  in DIMACS:
 16181 -16182  16183  574 -16184 0
 16181 -16182  16183  574 -16185 0
 16181 -16182  16183  574  16186 0

c  1-1 --> 0
c    (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0 ∧ -p_574) -> (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧ -b^{41, 15}_0)
c  in CNF:
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_2
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_1
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_0
c  in DIMACS:
 16181  16182 -16183  574 -16184 0
 16181  16182 -16183  574 -16185 0
 16181  16182 -16183  574 -16186 0

c  0-1 --> -1
c    (-b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧ -p_574) -> ( b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0)
c  in CNF:
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨  b^{41, 15}_2
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_1
c     b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨  b^{41, 15}_0
c  in DIMACS:
 16181  16182  16183  574  16184 0
 16181  16182  16183  574 -16185 0
 16181  16182  16183  574  16186 0

c  -1-1 --> -2
c    ( b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧  b^{41, 14}_0 ∧ -p_574) -> ( b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0)
c  in CNF:
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨  b^{41, 15}_2
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨  b^{41, 15}_1
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨  p_574 ∨ -b^{41, 15}_0
c  in DIMACS:
-16181  16182 -16183  574  16184 0
-16181  16182 -16183  574  16185 0
-16181  16182 -16183  574 -16186 0

c  -2-1 --> break 
c    ( b^{41, 14}_2 ∧  b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨  b^{41, 14}_0 ∨  p_574 ∨ break
c  in DIMACS:
-16181 -16182  16183  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 14}_2 ∧ -b^{41, 14}_1 ∧ -b^{41, 14}_0 ∧ true) 
c  in CNF:
c    -b^{41, 14}_2 ∨  b^{41, 14}_1 ∨  b^{41, 14}_0 ∨ false 
c  in DIMACS:
-16181  16182  16183  0

c  3 does not represent an automaton state.
c    -(-b^{41, 14}_2 ∧  b^{41, 14}_1 ∧  b^{41, 14}_0 ∧ true) 
c  in CNF:
c     b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ false 
c  in DIMACS:
 16181 -16182 -16183  0
c  -3 does not represent an automaton state.
c    -( b^{41, 14}_2 ∧  b^{41, 14}_1 ∧  b^{41, 14}_0 ∧ true) 
c  in CNF:
c    -b^{41, 14}_2 ∨ -b^{41, 14}_1 ∨ -b^{41, 14}_0 ∨ false 
c  in DIMACS:
-16181 -16182 -16183  0

c i = 15
c  -2+1 --> -1
c    ( b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧  p_615) -> ( b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0)
c  in CNF:
c    -b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨  b^{41, 16}_2
c    -b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_1
c    -b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨  b^{41, 16}_0
c  in DIMACS:
-16184 -16185  16186 -615  16187 0
-16184 -16185  16186 -615 -16188 0
-16184 -16185  16186 -615  16189 0

c  -1+1 --> 0
c    ( b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0 ∧  p_615) -> (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧ -b^{41, 16}_0)
c  in CNF:
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_2
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_1
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_0
c  in DIMACS:
-16184  16185 -16186 -615 -16187 0
-16184  16185 -16186 -615 -16188 0
-16184  16185 -16186 -615 -16189 0

c  0+1 --> 1
c    (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧  p_615) -> (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0)
c  in CNF:
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_2
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_1
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨  b^{41, 16}_0
c  in DIMACS:
 16184  16185  16186 -615 -16187 0
 16184  16185  16186 -615 -16188 0
 16184  16185  16186 -615  16189 0

c  1+1 --> 2
c    (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0 ∧  p_615) -> (-b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0)
c  in CNF:
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_2
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨  b^{41, 16}_1
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ -p_615 ∨ -b^{41, 16}_0
c  in DIMACS:
 16184  16185 -16186 -615 -16187 0
 16184  16185 -16186 -615  16188 0
 16184  16185 -16186 -615 -16189 0

c  2+1 --> break 
c    (-b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧  p_615) -> break
c  in CNF:
c     b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 16184 -16185  16186 -615 1162 0


c  2-1 --> 1
c    (-b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧ -p_615) -> (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0)
c  in CNF:
c     b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_2
c     b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_1
c     b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨  b^{41, 16}_0
c  in DIMACS:
 16184 -16185  16186  615 -16187 0
 16184 -16185  16186  615 -16188 0
 16184 -16185  16186  615  16189 0

c  1-1 --> 0
c    (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0 ∧ -p_615) -> (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧ -b^{41, 16}_0)
c  in CNF:
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_2
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_1
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_0
c  in DIMACS:
 16184  16185 -16186  615 -16187 0
 16184  16185 -16186  615 -16188 0
 16184  16185 -16186  615 -16189 0

c  0-1 --> -1
c    (-b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧ -p_615) -> ( b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0)
c  in CNF:
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨  b^{41, 16}_2
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_1
c     b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨  b^{41, 16}_0
c  in DIMACS:
 16184  16185  16186  615  16187 0
 16184  16185  16186  615 -16188 0
 16184  16185  16186  615  16189 0

c  -1-1 --> -2
c    ( b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧  b^{41, 15}_0 ∧ -p_615) -> ( b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0)
c  in CNF:
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨  b^{41, 16}_2
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨  b^{41, 16}_1
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨  p_615 ∨ -b^{41, 16}_0
c  in DIMACS:
-16184  16185 -16186  615  16187 0
-16184  16185 -16186  615  16188 0
-16184  16185 -16186  615 -16189 0

c  -2-1 --> break 
c    ( b^{41, 15}_2 ∧  b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨  b^{41, 15}_0 ∨  p_615 ∨ break
c  in DIMACS:
-16184 -16185  16186  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 15}_2 ∧ -b^{41, 15}_1 ∧ -b^{41, 15}_0 ∧ true) 
c  in CNF:
c    -b^{41, 15}_2 ∨  b^{41, 15}_1 ∨  b^{41, 15}_0 ∨ false 
c  in DIMACS:
-16184  16185  16186  0

c  3 does not represent an automaton state.
c    -(-b^{41, 15}_2 ∧  b^{41, 15}_1 ∧  b^{41, 15}_0 ∧ true) 
c  in CNF:
c     b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ false 
c  in DIMACS:
 16184 -16185 -16186  0
c  -3 does not represent an automaton state.
c    -( b^{41, 15}_2 ∧  b^{41, 15}_1 ∧  b^{41, 15}_0 ∧ true) 
c  in CNF:
c    -b^{41, 15}_2 ∨ -b^{41, 15}_1 ∨ -b^{41, 15}_0 ∨ false 
c  in DIMACS:
-16184 -16185 -16186  0

c i = 16
c  -2+1 --> -1
c    ( b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧  p_656) -> ( b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0)
c  in CNF:
c    -b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨  b^{41, 17}_2
c    -b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_1
c    -b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨  b^{41, 17}_0
c  in DIMACS:
-16187 -16188  16189 -656  16190 0
-16187 -16188  16189 -656 -16191 0
-16187 -16188  16189 -656  16192 0

c  -1+1 --> 0
c    ( b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0 ∧  p_656) -> (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧ -b^{41, 17}_0)
c  in CNF:
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_2
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_1
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_0
c  in DIMACS:
-16187  16188 -16189 -656 -16190 0
-16187  16188 -16189 -656 -16191 0
-16187  16188 -16189 -656 -16192 0

c  0+1 --> 1
c    (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧  p_656) -> (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0)
c  in CNF:
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_2
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_1
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨  b^{41, 17}_0
c  in DIMACS:
 16187  16188  16189 -656 -16190 0
 16187  16188  16189 -656 -16191 0
 16187  16188  16189 -656  16192 0

c  1+1 --> 2
c    (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0 ∧  p_656) -> (-b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0)
c  in CNF:
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_2
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨  b^{41, 17}_1
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ -p_656 ∨ -b^{41, 17}_0
c  in DIMACS:
 16187  16188 -16189 -656 -16190 0
 16187  16188 -16189 -656  16191 0
 16187  16188 -16189 -656 -16192 0

c  2+1 --> break 
c    (-b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧  p_656) -> break
c  in CNF:
c     b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 16187 -16188  16189 -656 1162 0


c  2-1 --> 1
c    (-b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧ -p_656) -> (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0)
c  in CNF:
c     b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_2
c     b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_1
c     b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨  b^{41, 17}_0
c  in DIMACS:
 16187 -16188  16189  656 -16190 0
 16187 -16188  16189  656 -16191 0
 16187 -16188  16189  656  16192 0

c  1-1 --> 0
c    (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0 ∧ -p_656) -> (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧ -b^{41, 17}_0)
c  in CNF:
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_2
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_1
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_0
c  in DIMACS:
 16187  16188 -16189  656 -16190 0
 16187  16188 -16189  656 -16191 0
 16187  16188 -16189  656 -16192 0

c  0-1 --> -1
c    (-b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧ -p_656) -> ( b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0)
c  in CNF:
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨  b^{41, 17}_2
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_1
c     b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨  b^{41, 17}_0
c  in DIMACS:
 16187  16188  16189  656  16190 0
 16187  16188  16189  656 -16191 0
 16187  16188  16189  656  16192 0

c  -1-1 --> -2
c    ( b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧  b^{41, 16}_0 ∧ -p_656) -> ( b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0)
c  in CNF:
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨  b^{41, 17}_2
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨  b^{41, 17}_1
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨  p_656 ∨ -b^{41, 17}_0
c  in DIMACS:
-16187  16188 -16189  656  16190 0
-16187  16188 -16189  656  16191 0
-16187  16188 -16189  656 -16192 0

c  -2-1 --> break 
c    ( b^{41, 16}_2 ∧  b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨  b^{41, 16}_0 ∨  p_656 ∨ break
c  in DIMACS:
-16187 -16188  16189  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 16}_2 ∧ -b^{41, 16}_1 ∧ -b^{41, 16}_0 ∧ true) 
c  in CNF:
c    -b^{41, 16}_2 ∨  b^{41, 16}_1 ∨  b^{41, 16}_0 ∨ false 
c  in DIMACS:
-16187  16188  16189  0

c  3 does not represent an automaton state.
c    -(-b^{41, 16}_2 ∧  b^{41, 16}_1 ∧  b^{41, 16}_0 ∧ true) 
c  in CNF:
c     b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ false 
c  in DIMACS:
 16187 -16188 -16189  0
c  -3 does not represent an automaton state.
c    -( b^{41, 16}_2 ∧  b^{41, 16}_1 ∧  b^{41, 16}_0 ∧ true) 
c  in CNF:
c    -b^{41, 16}_2 ∨ -b^{41, 16}_1 ∨ -b^{41, 16}_0 ∨ false 
c  in DIMACS:
-16187 -16188 -16189  0

c i = 17
c  -2+1 --> -1
c    ( b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧  p_697) -> ( b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0)
c  in CNF:
c    -b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨  b^{41, 18}_2
c    -b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_1
c    -b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨  b^{41, 18}_0
c  in DIMACS:
-16190 -16191  16192 -697  16193 0
-16190 -16191  16192 -697 -16194 0
-16190 -16191  16192 -697  16195 0

c  -1+1 --> 0
c    ( b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0 ∧  p_697) -> (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧ -b^{41, 18}_0)
c  in CNF:
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_2
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_1
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_0
c  in DIMACS:
-16190  16191 -16192 -697 -16193 0
-16190  16191 -16192 -697 -16194 0
-16190  16191 -16192 -697 -16195 0

c  0+1 --> 1
c    (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧  p_697) -> (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0)
c  in CNF:
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_2
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_1
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨  b^{41, 18}_0
c  in DIMACS:
 16190  16191  16192 -697 -16193 0
 16190  16191  16192 -697 -16194 0
 16190  16191  16192 -697  16195 0

c  1+1 --> 2
c    (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0 ∧  p_697) -> (-b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0)
c  in CNF:
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_2
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨  b^{41, 18}_1
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ -p_697 ∨ -b^{41, 18}_0
c  in DIMACS:
 16190  16191 -16192 -697 -16193 0
 16190  16191 -16192 -697  16194 0
 16190  16191 -16192 -697 -16195 0

c  2+1 --> break 
c    (-b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧  p_697) -> break
c  in CNF:
c     b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ -p_697 ∨ break
c  in DIMACS:
 16190 -16191  16192 -697 1162 0


c  2-1 --> 1
c    (-b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧ -p_697) -> (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0)
c  in CNF:
c     b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_2
c     b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_1
c     b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨  b^{41, 18}_0
c  in DIMACS:
 16190 -16191  16192  697 -16193 0
 16190 -16191  16192  697 -16194 0
 16190 -16191  16192  697  16195 0

c  1-1 --> 0
c    (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0 ∧ -p_697) -> (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧ -b^{41, 18}_0)
c  in CNF:
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_2
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_1
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_0
c  in DIMACS:
 16190  16191 -16192  697 -16193 0
 16190  16191 -16192  697 -16194 0
 16190  16191 -16192  697 -16195 0

c  0-1 --> -1
c    (-b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧ -p_697) -> ( b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0)
c  in CNF:
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨  b^{41, 18}_2
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_1
c     b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨  b^{41, 18}_0
c  in DIMACS:
 16190  16191  16192  697  16193 0
 16190  16191  16192  697 -16194 0
 16190  16191  16192  697  16195 0

c  -1-1 --> -2
c    ( b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧  b^{41, 17}_0 ∧ -p_697) -> ( b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0)
c  in CNF:
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨  b^{41, 18}_2
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨  b^{41, 18}_1
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨  p_697 ∨ -b^{41, 18}_0
c  in DIMACS:
-16190  16191 -16192  697  16193 0
-16190  16191 -16192  697  16194 0
-16190  16191 -16192  697 -16195 0

c  -2-1 --> break 
c    ( b^{41, 17}_2 ∧  b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧ -p_697) -> break
c  in CNF:
c    -b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨  b^{41, 17}_0 ∨  p_697 ∨ break
c  in DIMACS:
-16190 -16191  16192  697 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 17}_2 ∧ -b^{41, 17}_1 ∧ -b^{41, 17}_0 ∧ true) 
c  in CNF:
c    -b^{41, 17}_2 ∨  b^{41, 17}_1 ∨  b^{41, 17}_0 ∨ false 
c  in DIMACS:
-16190  16191  16192  0

c  3 does not represent an automaton state.
c    -(-b^{41, 17}_2 ∧  b^{41, 17}_1 ∧  b^{41, 17}_0 ∧ true) 
c  in CNF:
c     b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ false 
c  in DIMACS:
 16190 -16191 -16192  0
c  -3 does not represent an automaton state.
c    -( b^{41, 17}_2 ∧  b^{41, 17}_1 ∧  b^{41, 17}_0 ∧ true) 
c  in CNF:
c    -b^{41, 17}_2 ∨ -b^{41, 17}_1 ∨ -b^{41, 17}_0 ∨ false 
c  in DIMACS:
-16190 -16191 -16192  0

c i = 18
c  -2+1 --> -1
c    ( b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧  p_738) -> ( b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0)
c  in CNF:
c    -b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨  b^{41, 19}_2
c    -b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_1
c    -b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨  b^{41, 19}_0
c  in DIMACS:
-16193 -16194  16195 -738  16196 0
-16193 -16194  16195 -738 -16197 0
-16193 -16194  16195 -738  16198 0

c  -1+1 --> 0
c    ( b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0 ∧  p_738) -> (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧ -b^{41, 19}_0)
c  in CNF:
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_2
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_1
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_0
c  in DIMACS:
-16193  16194 -16195 -738 -16196 0
-16193  16194 -16195 -738 -16197 0
-16193  16194 -16195 -738 -16198 0

c  0+1 --> 1
c    (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧  p_738) -> (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0)
c  in CNF:
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_2
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_1
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨  b^{41, 19}_0
c  in DIMACS:
 16193  16194  16195 -738 -16196 0
 16193  16194  16195 -738 -16197 0
 16193  16194  16195 -738  16198 0

c  1+1 --> 2
c    (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0 ∧  p_738) -> (-b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0)
c  in CNF:
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_2
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨  b^{41, 19}_1
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ -p_738 ∨ -b^{41, 19}_0
c  in DIMACS:
 16193  16194 -16195 -738 -16196 0
 16193  16194 -16195 -738  16197 0
 16193  16194 -16195 -738 -16198 0

c  2+1 --> break 
c    (-b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧  p_738) -> break
c  in CNF:
c     b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 16193 -16194  16195 -738 1162 0


c  2-1 --> 1
c    (-b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧ -p_738) -> (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0)
c  in CNF:
c     b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_2
c     b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_1
c     b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨  b^{41, 19}_0
c  in DIMACS:
 16193 -16194  16195  738 -16196 0
 16193 -16194  16195  738 -16197 0
 16193 -16194  16195  738  16198 0

c  1-1 --> 0
c    (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0 ∧ -p_738) -> (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧ -b^{41, 19}_0)
c  in CNF:
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_2
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_1
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_0
c  in DIMACS:
 16193  16194 -16195  738 -16196 0
 16193  16194 -16195  738 -16197 0
 16193  16194 -16195  738 -16198 0

c  0-1 --> -1
c    (-b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧ -p_738) -> ( b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0)
c  in CNF:
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨  b^{41, 19}_2
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_1
c     b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨  b^{41, 19}_0
c  in DIMACS:
 16193  16194  16195  738  16196 0
 16193  16194  16195  738 -16197 0
 16193  16194  16195  738  16198 0

c  -1-1 --> -2
c    ( b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧  b^{41, 18}_0 ∧ -p_738) -> ( b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0)
c  in CNF:
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨  b^{41, 19}_2
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨  b^{41, 19}_1
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨  p_738 ∨ -b^{41, 19}_0
c  in DIMACS:
-16193  16194 -16195  738  16196 0
-16193  16194 -16195  738  16197 0
-16193  16194 -16195  738 -16198 0

c  -2-1 --> break 
c    ( b^{41, 18}_2 ∧  b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨  b^{41, 18}_0 ∨  p_738 ∨ break
c  in DIMACS:
-16193 -16194  16195  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 18}_2 ∧ -b^{41, 18}_1 ∧ -b^{41, 18}_0 ∧ true) 
c  in CNF:
c    -b^{41, 18}_2 ∨  b^{41, 18}_1 ∨  b^{41, 18}_0 ∨ false 
c  in DIMACS:
-16193  16194  16195  0

c  3 does not represent an automaton state.
c    -(-b^{41, 18}_2 ∧  b^{41, 18}_1 ∧  b^{41, 18}_0 ∧ true) 
c  in CNF:
c     b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ false 
c  in DIMACS:
 16193 -16194 -16195  0
c  -3 does not represent an automaton state.
c    -( b^{41, 18}_2 ∧  b^{41, 18}_1 ∧  b^{41, 18}_0 ∧ true) 
c  in CNF:
c    -b^{41, 18}_2 ∨ -b^{41, 18}_1 ∨ -b^{41, 18}_0 ∨ false 
c  in DIMACS:
-16193 -16194 -16195  0

c i = 19
c  -2+1 --> -1
c    ( b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧  p_779) -> ( b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0)
c  in CNF:
c    -b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨  b^{41, 20}_2
c    -b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_1
c    -b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨  b^{41, 20}_0
c  in DIMACS:
-16196 -16197  16198 -779  16199 0
-16196 -16197  16198 -779 -16200 0
-16196 -16197  16198 -779  16201 0

c  -1+1 --> 0
c    ( b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0 ∧  p_779) -> (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧ -b^{41, 20}_0)
c  in CNF:
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_2
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_1
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_0
c  in DIMACS:
-16196  16197 -16198 -779 -16199 0
-16196  16197 -16198 -779 -16200 0
-16196  16197 -16198 -779 -16201 0

c  0+1 --> 1
c    (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧  p_779) -> (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0)
c  in CNF:
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_2
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_1
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨  b^{41, 20}_0
c  in DIMACS:
 16196  16197  16198 -779 -16199 0
 16196  16197  16198 -779 -16200 0
 16196  16197  16198 -779  16201 0

c  1+1 --> 2
c    (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0 ∧  p_779) -> (-b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0)
c  in CNF:
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_2
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨  b^{41, 20}_1
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ -p_779 ∨ -b^{41, 20}_0
c  in DIMACS:
 16196  16197 -16198 -779 -16199 0
 16196  16197 -16198 -779  16200 0
 16196  16197 -16198 -779 -16201 0

c  2+1 --> break 
c    (-b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧  p_779) -> break
c  in CNF:
c     b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ -p_779 ∨ break
c  in DIMACS:
 16196 -16197  16198 -779 1162 0


c  2-1 --> 1
c    (-b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧ -p_779) -> (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0)
c  in CNF:
c     b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_2
c     b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_1
c     b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨  b^{41, 20}_0
c  in DIMACS:
 16196 -16197  16198  779 -16199 0
 16196 -16197  16198  779 -16200 0
 16196 -16197  16198  779  16201 0

c  1-1 --> 0
c    (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0 ∧ -p_779) -> (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧ -b^{41, 20}_0)
c  in CNF:
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_2
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_1
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_0
c  in DIMACS:
 16196  16197 -16198  779 -16199 0
 16196  16197 -16198  779 -16200 0
 16196  16197 -16198  779 -16201 0

c  0-1 --> -1
c    (-b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧ -p_779) -> ( b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0)
c  in CNF:
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨  b^{41, 20}_2
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_1
c     b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨  b^{41, 20}_0
c  in DIMACS:
 16196  16197  16198  779  16199 0
 16196  16197  16198  779 -16200 0
 16196  16197  16198  779  16201 0

c  -1-1 --> -2
c    ( b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧  b^{41, 19}_0 ∧ -p_779) -> ( b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0)
c  in CNF:
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨  b^{41, 20}_2
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨  b^{41, 20}_1
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨  p_779 ∨ -b^{41, 20}_0
c  in DIMACS:
-16196  16197 -16198  779  16199 0
-16196  16197 -16198  779  16200 0
-16196  16197 -16198  779 -16201 0

c  -2-1 --> break 
c    ( b^{41, 19}_2 ∧  b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧ -p_779) -> break
c  in CNF:
c    -b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨  b^{41, 19}_0 ∨  p_779 ∨ break
c  in DIMACS:
-16196 -16197  16198  779 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 19}_2 ∧ -b^{41, 19}_1 ∧ -b^{41, 19}_0 ∧ true) 
c  in CNF:
c    -b^{41, 19}_2 ∨  b^{41, 19}_1 ∨  b^{41, 19}_0 ∨ false 
c  in DIMACS:
-16196  16197  16198  0

c  3 does not represent an automaton state.
c    -(-b^{41, 19}_2 ∧  b^{41, 19}_1 ∧  b^{41, 19}_0 ∧ true) 
c  in CNF:
c     b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ false 
c  in DIMACS:
 16196 -16197 -16198  0
c  -3 does not represent an automaton state.
c    -( b^{41, 19}_2 ∧  b^{41, 19}_1 ∧  b^{41, 19}_0 ∧ true) 
c  in CNF:
c    -b^{41, 19}_2 ∨ -b^{41, 19}_1 ∨ -b^{41, 19}_0 ∨ false 
c  in DIMACS:
-16196 -16197 -16198  0

c i = 20
c  -2+1 --> -1
c    ( b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧  p_820) -> ( b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0)
c  in CNF:
c    -b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨  b^{41, 21}_2
c    -b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_1
c    -b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨  b^{41, 21}_0
c  in DIMACS:
-16199 -16200  16201 -820  16202 0
-16199 -16200  16201 -820 -16203 0
-16199 -16200  16201 -820  16204 0

c  -1+1 --> 0
c    ( b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0 ∧  p_820) -> (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧ -b^{41, 21}_0)
c  in CNF:
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_2
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_1
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_0
c  in DIMACS:
-16199  16200 -16201 -820 -16202 0
-16199  16200 -16201 -820 -16203 0
-16199  16200 -16201 -820 -16204 0

c  0+1 --> 1
c    (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧  p_820) -> (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0)
c  in CNF:
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_2
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_1
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨  b^{41, 21}_0
c  in DIMACS:
 16199  16200  16201 -820 -16202 0
 16199  16200  16201 -820 -16203 0
 16199  16200  16201 -820  16204 0

c  1+1 --> 2
c    (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0 ∧  p_820) -> (-b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0)
c  in CNF:
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_2
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨  b^{41, 21}_1
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ -p_820 ∨ -b^{41, 21}_0
c  in DIMACS:
 16199  16200 -16201 -820 -16202 0
 16199  16200 -16201 -820  16203 0
 16199  16200 -16201 -820 -16204 0

c  2+1 --> break 
c    (-b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧  p_820) -> break
c  in CNF:
c     b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 16199 -16200  16201 -820 1162 0


c  2-1 --> 1
c    (-b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧ -p_820) -> (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0)
c  in CNF:
c     b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_2
c     b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_1
c     b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨  b^{41, 21}_0
c  in DIMACS:
 16199 -16200  16201  820 -16202 0
 16199 -16200  16201  820 -16203 0
 16199 -16200  16201  820  16204 0

c  1-1 --> 0
c    (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0 ∧ -p_820) -> (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧ -b^{41, 21}_0)
c  in CNF:
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_2
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_1
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_0
c  in DIMACS:
 16199  16200 -16201  820 -16202 0
 16199  16200 -16201  820 -16203 0
 16199  16200 -16201  820 -16204 0

c  0-1 --> -1
c    (-b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧ -p_820) -> ( b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0)
c  in CNF:
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨  b^{41, 21}_2
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_1
c     b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨  b^{41, 21}_0
c  in DIMACS:
 16199  16200  16201  820  16202 0
 16199  16200  16201  820 -16203 0
 16199  16200  16201  820  16204 0

c  -1-1 --> -2
c    ( b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧  b^{41, 20}_0 ∧ -p_820) -> ( b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0)
c  in CNF:
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨  b^{41, 21}_2
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨  b^{41, 21}_1
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨  p_820 ∨ -b^{41, 21}_0
c  in DIMACS:
-16199  16200 -16201  820  16202 0
-16199  16200 -16201  820  16203 0
-16199  16200 -16201  820 -16204 0

c  -2-1 --> break 
c    ( b^{41, 20}_2 ∧  b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨  b^{41, 20}_0 ∨  p_820 ∨ break
c  in DIMACS:
-16199 -16200  16201  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 20}_2 ∧ -b^{41, 20}_1 ∧ -b^{41, 20}_0 ∧ true) 
c  in CNF:
c    -b^{41, 20}_2 ∨  b^{41, 20}_1 ∨  b^{41, 20}_0 ∨ false 
c  in DIMACS:
-16199  16200  16201  0

c  3 does not represent an automaton state.
c    -(-b^{41, 20}_2 ∧  b^{41, 20}_1 ∧  b^{41, 20}_0 ∧ true) 
c  in CNF:
c     b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ false 
c  in DIMACS:
 16199 -16200 -16201  0
c  -3 does not represent an automaton state.
c    -( b^{41, 20}_2 ∧  b^{41, 20}_1 ∧  b^{41, 20}_0 ∧ true) 
c  in CNF:
c    -b^{41, 20}_2 ∨ -b^{41, 20}_1 ∨ -b^{41, 20}_0 ∨ false 
c  in DIMACS:
-16199 -16200 -16201  0

c i = 21
c  -2+1 --> -1
c    ( b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧  p_861) -> ( b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0)
c  in CNF:
c    -b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨  b^{41, 22}_2
c    -b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_1
c    -b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨  b^{41, 22}_0
c  in DIMACS:
-16202 -16203  16204 -861  16205 0
-16202 -16203  16204 -861 -16206 0
-16202 -16203  16204 -861  16207 0

c  -1+1 --> 0
c    ( b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0 ∧  p_861) -> (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧ -b^{41, 22}_0)
c  in CNF:
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_2
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_1
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_0
c  in DIMACS:
-16202  16203 -16204 -861 -16205 0
-16202  16203 -16204 -861 -16206 0
-16202  16203 -16204 -861 -16207 0

c  0+1 --> 1
c    (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧  p_861) -> (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0)
c  in CNF:
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_2
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_1
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨  b^{41, 22}_0
c  in DIMACS:
 16202  16203  16204 -861 -16205 0
 16202  16203  16204 -861 -16206 0
 16202  16203  16204 -861  16207 0

c  1+1 --> 2
c    (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0 ∧  p_861) -> (-b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0)
c  in CNF:
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_2
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨  b^{41, 22}_1
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ -p_861 ∨ -b^{41, 22}_0
c  in DIMACS:
 16202  16203 -16204 -861 -16205 0
 16202  16203 -16204 -861  16206 0
 16202  16203 -16204 -861 -16207 0

c  2+1 --> break 
c    (-b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧  p_861) -> break
c  in CNF:
c     b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 16202 -16203  16204 -861 1162 0


c  2-1 --> 1
c    (-b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧ -p_861) -> (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0)
c  in CNF:
c     b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_2
c     b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_1
c     b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨  b^{41, 22}_0
c  in DIMACS:
 16202 -16203  16204  861 -16205 0
 16202 -16203  16204  861 -16206 0
 16202 -16203  16204  861  16207 0

c  1-1 --> 0
c    (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0 ∧ -p_861) -> (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧ -b^{41, 22}_0)
c  in CNF:
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_2
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_1
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_0
c  in DIMACS:
 16202  16203 -16204  861 -16205 0
 16202  16203 -16204  861 -16206 0
 16202  16203 -16204  861 -16207 0

c  0-1 --> -1
c    (-b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧ -p_861) -> ( b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0)
c  in CNF:
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨  b^{41, 22}_2
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_1
c     b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨  b^{41, 22}_0
c  in DIMACS:
 16202  16203  16204  861  16205 0
 16202  16203  16204  861 -16206 0
 16202  16203  16204  861  16207 0

c  -1-1 --> -2
c    ( b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧  b^{41, 21}_0 ∧ -p_861) -> ( b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0)
c  in CNF:
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨  b^{41, 22}_2
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨  b^{41, 22}_1
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨  p_861 ∨ -b^{41, 22}_0
c  in DIMACS:
-16202  16203 -16204  861  16205 0
-16202  16203 -16204  861  16206 0
-16202  16203 -16204  861 -16207 0

c  -2-1 --> break 
c    ( b^{41, 21}_2 ∧  b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨  b^{41, 21}_0 ∨  p_861 ∨ break
c  in DIMACS:
-16202 -16203  16204  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 21}_2 ∧ -b^{41, 21}_1 ∧ -b^{41, 21}_0 ∧ true) 
c  in CNF:
c    -b^{41, 21}_2 ∨  b^{41, 21}_1 ∨  b^{41, 21}_0 ∨ false 
c  in DIMACS:
-16202  16203  16204  0

c  3 does not represent an automaton state.
c    -(-b^{41, 21}_2 ∧  b^{41, 21}_1 ∧  b^{41, 21}_0 ∧ true) 
c  in CNF:
c     b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ false 
c  in DIMACS:
 16202 -16203 -16204  0
c  -3 does not represent an automaton state.
c    -( b^{41, 21}_2 ∧  b^{41, 21}_1 ∧  b^{41, 21}_0 ∧ true) 
c  in CNF:
c    -b^{41, 21}_2 ∨ -b^{41, 21}_1 ∨ -b^{41, 21}_0 ∨ false 
c  in DIMACS:
-16202 -16203 -16204  0

c i = 22
c  -2+1 --> -1
c    ( b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧  p_902) -> ( b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0)
c  in CNF:
c    -b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨  b^{41, 23}_2
c    -b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_1
c    -b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨  b^{41, 23}_0
c  in DIMACS:
-16205 -16206  16207 -902  16208 0
-16205 -16206  16207 -902 -16209 0
-16205 -16206  16207 -902  16210 0

c  -1+1 --> 0
c    ( b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0 ∧  p_902) -> (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧ -b^{41, 23}_0)
c  in CNF:
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_2
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_1
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_0
c  in DIMACS:
-16205  16206 -16207 -902 -16208 0
-16205  16206 -16207 -902 -16209 0
-16205  16206 -16207 -902 -16210 0

c  0+1 --> 1
c    (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧  p_902) -> (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0)
c  in CNF:
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_2
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_1
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨  b^{41, 23}_0
c  in DIMACS:
 16205  16206  16207 -902 -16208 0
 16205  16206  16207 -902 -16209 0
 16205  16206  16207 -902  16210 0

c  1+1 --> 2
c    (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0 ∧  p_902) -> (-b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0)
c  in CNF:
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_2
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨  b^{41, 23}_1
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ -p_902 ∨ -b^{41, 23}_0
c  in DIMACS:
 16205  16206 -16207 -902 -16208 0
 16205  16206 -16207 -902  16209 0
 16205  16206 -16207 -902 -16210 0

c  2+1 --> break 
c    (-b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧  p_902) -> break
c  in CNF:
c     b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 16205 -16206  16207 -902 1162 0


c  2-1 --> 1
c    (-b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧ -p_902) -> (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0)
c  in CNF:
c     b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_2
c     b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_1
c     b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨  b^{41, 23}_0
c  in DIMACS:
 16205 -16206  16207  902 -16208 0
 16205 -16206  16207  902 -16209 0
 16205 -16206  16207  902  16210 0

c  1-1 --> 0
c    (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0 ∧ -p_902) -> (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧ -b^{41, 23}_0)
c  in CNF:
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_2
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_1
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_0
c  in DIMACS:
 16205  16206 -16207  902 -16208 0
 16205  16206 -16207  902 -16209 0
 16205  16206 -16207  902 -16210 0

c  0-1 --> -1
c    (-b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧ -p_902) -> ( b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0)
c  in CNF:
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨  b^{41, 23}_2
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_1
c     b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨  b^{41, 23}_0
c  in DIMACS:
 16205  16206  16207  902  16208 0
 16205  16206  16207  902 -16209 0
 16205  16206  16207  902  16210 0

c  -1-1 --> -2
c    ( b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧  b^{41, 22}_0 ∧ -p_902) -> ( b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0)
c  in CNF:
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨  b^{41, 23}_2
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨  b^{41, 23}_1
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨  p_902 ∨ -b^{41, 23}_0
c  in DIMACS:
-16205  16206 -16207  902  16208 0
-16205  16206 -16207  902  16209 0
-16205  16206 -16207  902 -16210 0

c  -2-1 --> break 
c    ( b^{41, 22}_2 ∧  b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨  b^{41, 22}_0 ∨  p_902 ∨ break
c  in DIMACS:
-16205 -16206  16207  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 22}_2 ∧ -b^{41, 22}_1 ∧ -b^{41, 22}_0 ∧ true) 
c  in CNF:
c    -b^{41, 22}_2 ∨  b^{41, 22}_1 ∨  b^{41, 22}_0 ∨ false 
c  in DIMACS:
-16205  16206  16207  0

c  3 does not represent an automaton state.
c    -(-b^{41, 22}_2 ∧  b^{41, 22}_1 ∧  b^{41, 22}_0 ∧ true) 
c  in CNF:
c     b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ false 
c  in DIMACS:
 16205 -16206 -16207  0
c  -3 does not represent an automaton state.
c    -( b^{41, 22}_2 ∧  b^{41, 22}_1 ∧  b^{41, 22}_0 ∧ true) 
c  in CNF:
c    -b^{41, 22}_2 ∨ -b^{41, 22}_1 ∨ -b^{41, 22}_0 ∨ false 
c  in DIMACS:
-16205 -16206 -16207  0

c i = 23
c  -2+1 --> -1
c    ( b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧  p_943) -> ( b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0)
c  in CNF:
c    -b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨  b^{41, 24}_2
c    -b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_1
c    -b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨  b^{41, 24}_0
c  in DIMACS:
-16208 -16209  16210 -943  16211 0
-16208 -16209  16210 -943 -16212 0
-16208 -16209  16210 -943  16213 0

c  -1+1 --> 0
c    ( b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0 ∧  p_943) -> (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧ -b^{41, 24}_0)
c  in CNF:
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_2
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_1
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_0
c  in DIMACS:
-16208  16209 -16210 -943 -16211 0
-16208  16209 -16210 -943 -16212 0
-16208  16209 -16210 -943 -16213 0

c  0+1 --> 1
c    (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧  p_943) -> (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0)
c  in CNF:
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_2
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_1
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨  b^{41, 24}_0
c  in DIMACS:
 16208  16209  16210 -943 -16211 0
 16208  16209  16210 -943 -16212 0
 16208  16209  16210 -943  16213 0

c  1+1 --> 2
c    (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0 ∧  p_943) -> (-b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0)
c  in CNF:
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_2
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨  b^{41, 24}_1
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ -p_943 ∨ -b^{41, 24}_0
c  in DIMACS:
 16208  16209 -16210 -943 -16211 0
 16208  16209 -16210 -943  16212 0
 16208  16209 -16210 -943 -16213 0

c  2+1 --> break 
c    (-b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧  p_943) -> break
c  in CNF:
c     b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ -p_943 ∨ break
c  in DIMACS:
 16208 -16209  16210 -943 1162 0


c  2-1 --> 1
c    (-b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧ -p_943) -> (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0)
c  in CNF:
c     b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_2
c     b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_1
c     b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨  b^{41, 24}_0
c  in DIMACS:
 16208 -16209  16210  943 -16211 0
 16208 -16209  16210  943 -16212 0
 16208 -16209  16210  943  16213 0

c  1-1 --> 0
c    (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0 ∧ -p_943) -> (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧ -b^{41, 24}_0)
c  in CNF:
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_2
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_1
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_0
c  in DIMACS:
 16208  16209 -16210  943 -16211 0
 16208  16209 -16210  943 -16212 0
 16208  16209 -16210  943 -16213 0

c  0-1 --> -1
c    (-b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧ -p_943) -> ( b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0)
c  in CNF:
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨  b^{41, 24}_2
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_1
c     b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨  b^{41, 24}_0
c  in DIMACS:
 16208  16209  16210  943  16211 0
 16208  16209  16210  943 -16212 0
 16208  16209  16210  943  16213 0

c  -1-1 --> -2
c    ( b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧  b^{41, 23}_0 ∧ -p_943) -> ( b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0)
c  in CNF:
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨  b^{41, 24}_2
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨  b^{41, 24}_1
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨  p_943 ∨ -b^{41, 24}_0
c  in DIMACS:
-16208  16209 -16210  943  16211 0
-16208  16209 -16210  943  16212 0
-16208  16209 -16210  943 -16213 0

c  -2-1 --> break 
c    ( b^{41, 23}_2 ∧  b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧ -p_943) -> break
c  in CNF:
c    -b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨  b^{41, 23}_0 ∨  p_943 ∨ break
c  in DIMACS:
-16208 -16209  16210  943 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 23}_2 ∧ -b^{41, 23}_1 ∧ -b^{41, 23}_0 ∧ true) 
c  in CNF:
c    -b^{41, 23}_2 ∨  b^{41, 23}_1 ∨  b^{41, 23}_0 ∨ false 
c  in DIMACS:
-16208  16209  16210  0

c  3 does not represent an automaton state.
c    -(-b^{41, 23}_2 ∧  b^{41, 23}_1 ∧  b^{41, 23}_0 ∧ true) 
c  in CNF:
c     b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ false 
c  in DIMACS:
 16208 -16209 -16210  0
c  -3 does not represent an automaton state.
c    -( b^{41, 23}_2 ∧  b^{41, 23}_1 ∧  b^{41, 23}_0 ∧ true) 
c  in CNF:
c    -b^{41, 23}_2 ∨ -b^{41, 23}_1 ∨ -b^{41, 23}_0 ∨ false 
c  in DIMACS:
-16208 -16209 -16210  0

c i = 24
c  -2+1 --> -1
c    ( b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧  p_984) -> ( b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0)
c  in CNF:
c    -b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨  b^{41, 25}_2
c    -b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_1
c    -b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨  b^{41, 25}_0
c  in DIMACS:
-16211 -16212  16213 -984  16214 0
-16211 -16212  16213 -984 -16215 0
-16211 -16212  16213 -984  16216 0

c  -1+1 --> 0
c    ( b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0 ∧  p_984) -> (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧ -b^{41, 25}_0)
c  in CNF:
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_2
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_1
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_0
c  in DIMACS:
-16211  16212 -16213 -984 -16214 0
-16211  16212 -16213 -984 -16215 0
-16211  16212 -16213 -984 -16216 0

c  0+1 --> 1
c    (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧  p_984) -> (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0)
c  in CNF:
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_2
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_1
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨  b^{41, 25}_0
c  in DIMACS:
 16211  16212  16213 -984 -16214 0
 16211  16212  16213 -984 -16215 0
 16211  16212  16213 -984  16216 0

c  1+1 --> 2
c    (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0 ∧  p_984) -> (-b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0)
c  in CNF:
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_2
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨  b^{41, 25}_1
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ -p_984 ∨ -b^{41, 25}_0
c  in DIMACS:
 16211  16212 -16213 -984 -16214 0
 16211  16212 -16213 -984  16215 0
 16211  16212 -16213 -984 -16216 0

c  2+1 --> break 
c    (-b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧  p_984) -> break
c  in CNF:
c     b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 16211 -16212  16213 -984 1162 0


c  2-1 --> 1
c    (-b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧ -p_984) -> (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0)
c  in CNF:
c     b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_2
c     b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_1
c     b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨  b^{41, 25}_0
c  in DIMACS:
 16211 -16212  16213  984 -16214 0
 16211 -16212  16213  984 -16215 0
 16211 -16212  16213  984  16216 0

c  1-1 --> 0
c    (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0 ∧ -p_984) -> (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧ -b^{41, 25}_0)
c  in CNF:
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_2
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_1
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_0
c  in DIMACS:
 16211  16212 -16213  984 -16214 0
 16211  16212 -16213  984 -16215 0
 16211  16212 -16213  984 -16216 0

c  0-1 --> -1
c    (-b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧ -p_984) -> ( b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0)
c  in CNF:
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨  b^{41, 25}_2
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_1
c     b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨  b^{41, 25}_0
c  in DIMACS:
 16211  16212  16213  984  16214 0
 16211  16212  16213  984 -16215 0
 16211  16212  16213  984  16216 0

c  -1-1 --> -2
c    ( b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧  b^{41, 24}_0 ∧ -p_984) -> ( b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0)
c  in CNF:
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨  b^{41, 25}_2
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨  b^{41, 25}_1
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨  p_984 ∨ -b^{41, 25}_0
c  in DIMACS:
-16211  16212 -16213  984  16214 0
-16211  16212 -16213  984  16215 0
-16211  16212 -16213  984 -16216 0

c  -2-1 --> break 
c    ( b^{41, 24}_2 ∧  b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨  b^{41, 24}_0 ∨  p_984 ∨ break
c  in DIMACS:
-16211 -16212  16213  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 24}_2 ∧ -b^{41, 24}_1 ∧ -b^{41, 24}_0 ∧ true) 
c  in CNF:
c    -b^{41, 24}_2 ∨  b^{41, 24}_1 ∨  b^{41, 24}_0 ∨ false 
c  in DIMACS:
-16211  16212  16213  0

c  3 does not represent an automaton state.
c    -(-b^{41, 24}_2 ∧  b^{41, 24}_1 ∧  b^{41, 24}_0 ∧ true) 
c  in CNF:
c     b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ false 
c  in DIMACS:
 16211 -16212 -16213  0
c  -3 does not represent an automaton state.
c    -( b^{41, 24}_2 ∧  b^{41, 24}_1 ∧  b^{41, 24}_0 ∧ true) 
c  in CNF:
c    -b^{41, 24}_2 ∨ -b^{41, 24}_1 ∨ -b^{41, 24}_0 ∨ false 
c  in DIMACS:
-16211 -16212 -16213  0

c i = 25
c  -2+1 --> -1
c    ( b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧  p_1025) -> ( b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0)
c  in CNF:
c    -b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨  b^{41, 26}_2
c    -b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_1
c    -b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨  b^{41, 26}_0
c  in DIMACS:
-16214 -16215  16216 -1025  16217 0
-16214 -16215  16216 -1025 -16218 0
-16214 -16215  16216 -1025  16219 0

c  -1+1 --> 0
c    ( b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0 ∧  p_1025) -> (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧ -b^{41, 26}_0)
c  in CNF:
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_2
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_1
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_0
c  in DIMACS:
-16214  16215 -16216 -1025 -16217 0
-16214  16215 -16216 -1025 -16218 0
-16214  16215 -16216 -1025 -16219 0

c  0+1 --> 1
c    (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧  p_1025) -> (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0)
c  in CNF:
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_2
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_1
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨  b^{41, 26}_0
c  in DIMACS:
 16214  16215  16216 -1025 -16217 0
 16214  16215  16216 -1025 -16218 0
 16214  16215  16216 -1025  16219 0

c  1+1 --> 2
c    (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0 ∧  p_1025) -> (-b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0)
c  in CNF:
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_2
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨  b^{41, 26}_1
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ -p_1025 ∨ -b^{41, 26}_0
c  in DIMACS:
 16214  16215 -16216 -1025 -16217 0
 16214  16215 -16216 -1025  16218 0
 16214  16215 -16216 -1025 -16219 0

c  2+1 --> break 
c    (-b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧  p_1025) -> break
c  in CNF:
c     b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ -p_1025 ∨ break
c  in DIMACS:
 16214 -16215  16216 -1025 1162 0


c  2-1 --> 1
c    (-b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧ -p_1025) -> (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0)
c  in CNF:
c     b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_2
c     b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_1
c     b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨  b^{41, 26}_0
c  in DIMACS:
 16214 -16215  16216  1025 -16217 0
 16214 -16215  16216  1025 -16218 0
 16214 -16215  16216  1025  16219 0

c  1-1 --> 0
c    (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0 ∧ -p_1025) -> (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧ -b^{41, 26}_0)
c  in CNF:
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_2
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_1
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_0
c  in DIMACS:
 16214  16215 -16216  1025 -16217 0
 16214  16215 -16216  1025 -16218 0
 16214  16215 -16216  1025 -16219 0

c  0-1 --> -1
c    (-b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧ -p_1025) -> ( b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0)
c  in CNF:
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨  b^{41, 26}_2
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_1
c     b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨  b^{41, 26}_0
c  in DIMACS:
 16214  16215  16216  1025  16217 0
 16214  16215  16216  1025 -16218 0
 16214  16215  16216  1025  16219 0

c  -1-1 --> -2
c    ( b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧  b^{41, 25}_0 ∧ -p_1025) -> ( b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0)
c  in CNF:
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨  b^{41, 26}_2
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨  b^{41, 26}_1
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨  p_1025 ∨ -b^{41, 26}_0
c  in DIMACS:
-16214  16215 -16216  1025  16217 0
-16214  16215 -16216  1025  16218 0
-16214  16215 -16216  1025 -16219 0

c  -2-1 --> break 
c    ( b^{41, 25}_2 ∧  b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧ -p_1025) -> break
c  in CNF:
c    -b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨  b^{41, 25}_0 ∨  p_1025 ∨ break
c  in DIMACS:
-16214 -16215  16216  1025 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 25}_2 ∧ -b^{41, 25}_1 ∧ -b^{41, 25}_0 ∧ true) 
c  in CNF:
c    -b^{41, 25}_2 ∨  b^{41, 25}_1 ∨  b^{41, 25}_0 ∨ false 
c  in DIMACS:
-16214  16215  16216  0

c  3 does not represent an automaton state.
c    -(-b^{41, 25}_2 ∧  b^{41, 25}_1 ∧  b^{41, 25}_0 ∧ true) 
c  in CNF:
c     b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ false 
c  in DIMACS:
 16214 -16215 -16216  0
c  -3 does not represent an automaton state.
c    -( b^{41, 25}_2 ∧  b^{41, 25}_1 ∧  b^{41, 25}_0 ∧ true) 
c  in CNF:
c    -b^{41, 25}_2 ∨ -b^{41, 25}_1 ∨ -b^{41, 25}_0 ∨ false 
c  in DIMACS:
-16214 -16215 -16216  0

c i = 26
c  -2+1 --> -1
c    ( b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧  p_1066) -> ( b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0)
c  in CNF:
c    -b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨  b^{41, 27}_2
c    -b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_1
c    -b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨  b^{41, 27}_0
c  in DIMACS:
-16217 -16218  16219 -1066  16220 0
-16217 -16218  16219 -1066 -16221 0
-16217 -16218  16219 -1066  16222 0

c  -1+1 --> 0
c    ( b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0 ∧  p_1066) -> (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧ -b^{41, 27}_0)
c  in CNF:
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_2
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_1
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_0
c  in DIMACS:
-16217  16218 -16219 -1066 -16220 0
-16217  16218 -16219 -1066 -16221 0
-16217  16218 -16219 -1066 -16222 0

c  0+1 --> 1
c    (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧  p_1066) -> (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0)
c  in CNF:
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_2
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_1
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨  b^{41, 27}_0
c  in DIMACS:
 16217  16218  16219 -1066 -16220 0
 16217  16218  16219 -1066 -16221 0
 16217  16218  16219 -1066  16222 0

c  1+1 --> 2
c    (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0 ∧  p_1066) -> (-b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0)
c  in CNF:
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_2
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨  b^{41, 27}_1
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ -p_1066 ∨ -b^{41, 27}_0
c  in DIMACS:
 16217  16218 -16219 -1066 -16220 0
 16217  16218 -16219 -1066  16221 0
 16217  16218 -16219 -1066 -16222 0

c  2+1 --> break 
c    (-b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 16217 -16218  16219 -1066 1162 0


c  2-1 --> 1
c    (-b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧ -p_1066) -> (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0)
c  in CNF:
c     b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_2
c     b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_1
c     b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨  b^{41, 27}_0
c  in DIMACS:
 16217 -16218  16219  1066 -16220 0
 16217 -16218  16219  1066 -16221 0
 16217 -16218  16219  1066  16222 0

c  1-1 --> 0
c    (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0 ∧ -p_1066) -> (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧ -b^{41, 27}_0)
c  in CNF:
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_2
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_1
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_0
c  in DIMACS:
 16217  16218 -16219  1066 -16220 0
 16217  16218 -16219  1066 -16221 0
 16217  16218 -16219  1066 -16222 0

c  0-1 --> -1
c    (-b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧ -p_1066) -> ( b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0)
c  in CNF:
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨  b^{41, 27}_2
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_1
c     b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨  b^{41, 27}_0
c  in DIMACS:
 16217  16218  16219  1066  16220 0
 16217  16218  16219  1066 -16221 0
 16217  16218  16219  1066  16222 0

c  -1-1 --> -2
c    ( b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧  b^{41, 26}_0 ∧ -p_1066) -> ( b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0)
c  in CNF:
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨  b^{41, 27}_2
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨  b^{41, 27}_1
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨  p_1066 ∨ -b^{41, 27}_0
c  in DIMACS:
-16217  16218 -16219  1066  16220 0
-16217  16218 -16219  1066  16221 0
-16217  16218 -16219  1066 -16222 0

c  -2-1 --> break 
c    ( b^{41, 26}_2 ∧  b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨  b^{41, 26}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-16217 -16218  16219  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 26}_2 ∧ -b^{41, 26}_1 ∧ -b^{41, 26}_0 ∧ true) 
c  in CNF:
c    -b^{41, 26}_2 ∨  b^{41, 26}_1 ∨  b^{41, 26}_0 ∨ false 
c  in DIMACS:
-16217  16218  16219  0

c  3 does not represent an automaton state.
c    -(-b^{41, 26}_2 ∧  b^{41, 26}_1 ∧  b^{41, 26}_0 ∧ true) 
c  in CNF:
c     b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ false 
c  in DIMACS:
 16217 -16218 -16219  0
c  -3 does not represent an automaton state.
c    -( b^{41, 26}_2 ∧  b^{41, 26}_1 ∧  b^{41, 26}_0 ∧ true) 
c  in CNF:
c    -b^{41, 26}_2 ∨ -b^{41, 26}_1 ∨ -b^{41, 26}_0 ∨ false 
c  in DIMACS:
-16217 -16218 -16219  0

c i = 27
c  -2+1 --> -1
c    ( b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧  p_1107) -> ( b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0)
c  in CNF:
c    -b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨  b^{41, 28}_2
c    -b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_1
c    -b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨  b^{41, 28}_0
c  in DIMACS:
-16220 -16221  16222 -1107  16223 0
-16220 -16221  16222 -1107 -16224 0
-16220 -16221  16222 -1107  16225 0

c  -1+1 --> 0
c    ( b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0 ∧  p_1107) -> (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧ -b^{41, 28}_0)
c  in CNF:
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_2
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_1
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_0
c  in DIMACS:
-16220  16221 -16222 -1107 -16223 0
-16220  16221 -16222 -1107 -16224 0
-16220  16221 -16222 -1107 -16225 0

c  0+1 --> 1
c    (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧  p_1107) -> (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0)
c  in CNF:
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_2
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_1
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨  b^{41, 28}_0
c  in DIMACS:
 16220  16221  16222 -1107 -16223 0
 16220  16221  16222 -1107 -16224 0
 16220  16221  16222 -1107  16225 0

c  1+1 --> 2
c    (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0 ∧  p_1107) -> (-b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0)
c  in CNF:
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_2
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨  b^{41, 28}_1
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ -p_1107 ∨ -b^{41, 28}_0
c  in DIMACS:
 16220  16221 -16222 -1107 -16223 0
 16220  16221 -16222 -1107  16224 0
 16220  16221 -16222 -1107 -16225 0

c  2+1 --> break 
c    (-b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 16220 -16221  16222 -1107 1162 0


c  2-1 --> 1
c    (-b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧ -p_1107) -> (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0)
c  in CNF:
c     b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_2
c     b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_1
c     b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨  b^{41, 28}_0
c  in DIMACS:
 16220 -16221  16222  1107 -16223 0
 16220 -16221  16222  1107 -16224 0
 16220 -16221  16222  1107  16225 0

c  1-1 --> 0
c    (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0 ∧ -p_1107) -> (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧ -b^{41, 28}_0)
c  in CNF:
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_2
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_1
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_0
c  in DIMACS:
 16220  16221 -16222  1107 -16223 0
 16220  16221 -16222  1107 -16224 0
 16220  16221 -16222  1107 -16225 0

c  0-1 --> -1
c    (-b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧ -p_1107) -> ( b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0)
c  in CNF:
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨  b^{41, 28}_2
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_1
c     b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨  b^{41, 28}_0
c  in DIMACS:
 16220  16221  16222  1107  16223 0
 16220  16221  16222  1107 -16224 0
 16220  16221  16222  1107  16225 0

c  -1-1 --> -2
c    ( b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧  b^{41, 27}_0 ∧ -p_1107) -> ( b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0)
c  in CNF:
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨  b^{41, 28}_2
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨  b^{41, 28}_1
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨  p_1107 ∨ -b^{41, 28}_0
c  in DIMACS:
-16220  16221 -16222  1107  16223 0
-16220  16221 -16222  1107  16224 0
-16220  16221 -16222  1107 -16225 0

c  -2-1 --> break 
c    ( b^{41, 27}_2 ∧  b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨  b^{41, 27}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-16220 -16221  16222  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 27}_2 ∧ -b^{41, 27}_1 ∧ -b^{41, 27}_0 ∧ true) 
c  in CNF:
c    -b^{41, 27}_2 ∨  b^{41, 27}_1 ∨  b^{41, 27}_0 ∨ false 
c  in DIMACS:
-16220  16221  16222  0

c  3 does not represent an automaton state.
c    -(-b^{41, 27}_2 ∧  b^{41, 27}_1 ∧  b^{41, 27}_0 ∧ true) 
c  in CNF:
c     b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ false 
c  in DIMACS:
 16220 -16221 -16222  0
c  -3 does not represent an automaton state.
c    -( b^{41, 27}_2 ∧  b^{41, 27}_1 ∧  b^{41, 27}_0 ∧ true) 
c  in CNF:
c    -b^{41, 27}_2 ∨ -b^{41, 27}_1 ∨ -b^{41, 27}_0 ∨ false 
c  in DIMACS:
-16220 -16221 -16222  0

c i = 28
c  -2+1 --> -1
c    ( b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧  p_1148) -> ( b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧  b^{41, 29}_0)
c  in CNF:
c    -b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨  b^{41, 29}_2
c    -b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_1
c    -b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨  b^{41, 29}_0
c  in DIMACS:
-16223 -16224  16225 -1148  16226 0
-16223 -16224  16225 -1148 -16227 0
-16223 -16224  16225 -1148  16228 0

c  -1+1 --> 0
c    ( b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0 ∧  p_1148) -> (-b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧ -b^{41, 29}_0)
c  in CNF:
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_2
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_1
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_0
c  in DIMACS:
-16223  16224 -16225 -1148 -16226 0
-16223  16224 -16225 -1148 -16227 0
-16223  16224 -16225 -1148 -16228 0

c  0+1 --> 1
c    (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧  p_1148) -> (-b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧  b^{41, 29}_0)
c  in CNF:
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_2
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_1
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨  b^{41, 29}_0
c  in DIMACS:
 16223  16224  16225 -1148 -16226 0
 16223  16224  16225 -1148 -16227 0
 16223  16224  16225 -1148  16228 0

c  1+1 --> 2
c    (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0 ∧  p_1148) -> (-b^{41, 29}_2 ∧  b^{41, 29}_1 ∧ -b^{41, 29}_0)
c  in CNF:
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_2
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨  b^{41, 29}_1
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ -p_1148 ∨ -b^{41, 29}_0
c  in DIMACS:
 16223  16224 -16225 -1148 -16226 0
 16223  16224 -16225 -1148  16227 0
 16223  16224 -16225 -1148 -16228 0

c  2+1 --> break 
c    (-b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 16223 -16224  16225 -1148 1162 0


c  2-1 --> 1
c    (-b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧ -p_1148) -> (-b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧  b^{41, 29}_0)
c  in CNF:
c     b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_2
c     b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_1
c     b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨  b^{41, 29}_0
c  in DIMACS:
 16223 -16224  16225  1148 -16226 0
 16223 -16224  16225  1148 -16227 0
 16223 -16224  16225  1148  16228 0

c  1-1 --> 0
c    (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0 ∧ -p_1148) -> (-b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧ -b^{41, 29}_0)
c  in CNF:
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_2
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_1
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_0
c  in DIMACS:
 16223  16224 -16225  1148 -16226 0
 16223  16224 -16225  1148 -16227 0
 16223  16224 -16225  1148 -16228 0

c  0-1 --> -1
c    (-b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧ -p_1148) -> ( b^{41, 29}_2 ∧ -b^{41, 29}_1 ∧  b^{41, 29}_0)
c  in CNF:
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨  b^{41, 29}_2
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_1
c     b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨  b^{41, 29}_0
c  in DIMACS:
 16223  16224  16225  1148  16226 0
 16223  16224  16225  1148 -16227 0
 16223  16224  16225  1148  16228 0

c  -1-1 --> -2
c    ( b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧  b^{41, 28}_0 ∧ -p_1148) -> ( b^{41, 29}_2 ∧  b^{41, 29}_1 ∧ -b^{41, 29}_0)
c  in CNF:
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨  b^{41, 29}_2
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨  b^{41, 29}_1
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨  p_1148 ∨ -b^{41, 29}_0
c  in DIMACS:
-16223  16224 -16225  1148  16226 0
-16223  16224 -16225  1148  16227 0
-16223  16224 -16225  1148 -16228 0

c  -2-1 --> break 
c    ( b^{41, 28}_2 ∧  b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨  b^{41, 28}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-16223 -16224  16225  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{41, 28}_2 ∧ -b^{41, 28}_1 ∧ -b^{41, 28}_0 ∧ true) 
c  in CNF:
c    -b^{41, 28}_2 ∨  b^{41, 28}_1 ∨  b^{41, 28}_0 ∨ false 
c  in DIMACS:
-16223  16224  16225  0

c  3 does not represent an automaton state.
c    -(-b^{41, 28}_2 ∧  b^{41, 28}_1 ∧  b^{41, 28}_0 ∧ true) 
c  in CNF:
c     b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ false 
c  in DIMACS:
 16223 -16224 -16225  0
c  -3 does not represent an automaton state.
c    -( b^{41, 28}_2 ∧  b^{41, 28}_1 ∧  b^{41, 28}_0 ∧ true) 
c  in CNF:
c    -b^{41, 28}_2 ∨ -b^{41, 28}_1 ∨ -b^{41, 28}_0 ∨ false 
c  in DIMACS:
-16223 -16224 -16225  0

c INIT for k = 42
c    -b^{42, 1}_2
c    -b^{42, 1}_1
c    -b^{42, 1}_0
c  in DIMACS:
-16229 0
-16230 0
-16231 0

c Transitions for k = 42
c i = 1
c  -2+1 --> -1
c    ( b^{42, 1}_2 ∧  b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧  p_42) -> ( b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0)
c  in CNF:
c    -b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨  b^{42, 2}_2
c    -b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_1
c    -b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨  b^{42, 2}_0
c  in DIMACS:
-16229 -16230  16231 -42  16232 0
-16229 -16230  16231 -42 -16233 0
-16229 -16230  16231 -42  16234 0

c  -1+1 --> 0
c    ( b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧  b^{42, 1}_0 ∧  p_42) -> (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧ -b^{42, 2}_0)
c  in CNF:
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_2
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_1
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_0
c  in DIMACS:
-16229  16230 -16231 -42 -16232 0
-16229  16230 -16231 -42 -16233 0
-16229  16230 -16231 -42 -16234 0

c  0+1 --> 1
c    (-b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧  p_42) -> (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0)
c  in CNF:
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_2
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_1
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨  b^{42, 2}_0
c  in DIMACS:
 16229  16230  16231 -42 -16232 0
 16229  16230  16231 -42 -16233 0
 16229  16230  16231 -42  16234 0

c  1+1 --> 2
c    (-b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧  b^{42, 1}_0 ∧  p_42) -> (-b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0)
c  in CNF:
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_2
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨  b^{42, 2}_1
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ -p_42 ∨ -b^{42, 2}_0
c  in DIMACS:
 16229  16230 -16231 -42 -16232 0
 16229  16230 -16231 -42  16233 0
 16229  16230 -16231 -42 -16234 0

c  2+1 --> break 
c    (-b^{42, 1}_2 ∧  b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧  p_42) -> break
c  in CNF:
c     b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ -p_42 ∨ break
c  in DIMACS:
 16229 -16230  16231 -42 1162 0


c  2-1 --> 1
c    (-b^{42, 1}_2 ∧  b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧ -p_42) -> (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0)
c  in CNF:
c     b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_2
c     b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_1
c     b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨  b^{42, 2}_0
c  in DIMACS:
 16229 -16230  16231  42 -16232 0
 16229 -16230  16231  42 -16233 0
 16229 -16230  16231  42  16234 0

c  1-1 --> 0
c    (-b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧  b^{42, 1}_0 ∧ -p_42) -> (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧ -b^{42, 2}_0)
c  in CNF:
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_2
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_1
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_0
c  in DIMACS:
 16229  16230 -16231  42 -16232 0
 16229  16230 -16231  42 -16233 0
 16229  16230 -16231  42 -16234 0

c  0-1 --> -1
c    (-b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧ -p_42) -> ( b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0)
c  in CNF:
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨  b^{42, 2}_2
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_1
c     b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨  b^{42, 2}_0
c  in DIMACS:
 16229  16230  16231  42  16232 0
 16229  16230  16231  42 -16233 0
 16229  16230  16231  42  16234 0

c  -1-1 --> -2
c    ( b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧  b^{42, 1}_0 ∧ -p_42) -> ( b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0)
c  in CNF:
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨  b^{42, 2}_2
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨  b^{42, 2}_1
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨  p_42 ∨ -b^{42, 2}_0
c  in DIMACS:
-16229  16230 -16231  42  16232 0
-16229  16230 -16231  42  16233 0
-16229  16230 -16231  42 -16234 0

c  -2-1 --> break 
c    ( b^{42, 1}_2 ∧  b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧ -p_42) -> break
c  in CNF:
c    -b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨  b^{42, 1}_0 ∨  p_42 ∨ break
c  in DIMACS:
-16229 -16230  16231  42 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 1}_2 ∧ -b^{42, 1}_1 ∧ -b^{42, 1}_0 ∧ true) 
c  in CNF:
c    -b^{42, 1}_2 ∨  b^{42, 1}_1 ∨  b^{42, 1}_0 ∨ false 
c  in DIMACS:
-16229  16230  16231  0

c  3 does not represent an automaton state.
c    -(-b^{42, 1}_2 ∧  b^{42, 1}_1 ∧  b^{42, 1}_0 ∧ true) 
c  in CNF:
c     b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ false 
c  in DIMACS:
 16229 -16230 -16231  0
c  -3 does not represent an automaton state.
c    -( b^{42, 1}_2 ∧  b^{42, 1}_1 ∧  b^{42, 1}_0 ∧ true) 
c  in CNF:
c    -b^{42, 1}_2 ∨ -b^{42, 1}_1 ∨ -b^{42, 1}_0 ∨ false 
c  in DIMACS:
-16229 -16230 -16231  0

c i = 2
c  -2+1 --> -1
c    ( b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧  p_84) -> ( b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0)
c  in CNF:
c    -b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨  b^{42, 3}_2
c    -b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_1
c    -b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨  b^{42, 3}_0
c  in DIMACS:
-16232 -16233  16234 -84  16235 0
-16232 -16233  16234 -84 -16236 0
-16232 -16233  16234 -84  16237 0

c  -1+1 --> 0
c    ( b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0 ∧  p_84) -> (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧ -b^{42, 3}_0)
c  in CNF:
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_2
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_1
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_0
c  in DIMACS:
-16232  16233 -16234 -84 -16235 0
-16232  16233 -16234 -84 -16236 0
-16232  16233 -16234 -84 -16237 0

c  0+1 --> 1
c    (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧  p_84) -> (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0)
c  in CNF:
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_2
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_1
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨  b^{42, 3}_0
c  in DIMACS:
 16232  16233  16234 -84 -16235 0
 16232  16233  16234 -84 -16236 0
 16232  16233  16234 -84  16237 0

c  1+1 --> 2
c    (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0 ∧  p_84) -> (-b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0)
c  in CNF:
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_2
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨  b^{42, 3}_1
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ -p_84 ∨ -b^{42, 3}_0
c  in DIMACS:
 16232  16233 -16234 -84 -16235 0
 16232  16233 -16234 -84  16236 0
 16232  16233 -16234 -84 -16237 0

c  2+1 --> break 
c    (-b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧  p_84) -> break
c  in CNF:
c     b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 16232 -16233  16234 -84 1162 0


c  2-1 --> 1
c    (-b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧ -p_84) -> (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0)
c  in CNF:
c     b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_2
c     b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_1
c     b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨  b^{42, 3}_0
c  in DIMACS:
 16232 -16233  16234  84 -16235 0
 16232 -16233  16234  84 -16236 0
 16232 -16233  16234  84  16237 0

c  1-1 --> 0
c    (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0 ∧ -p_84) -> (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧ -b^{42, 3}_0)
c  in CNF:
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_2
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_1
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_0
c  in DIMACS:
 16232  16233 -16234  84 -16235 0
 16232  16233 -16234  84 -16236 0
 16232  16233 -16234  84 -16237 0

c  0-1 --> -1
c    (-b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧ -p_84) -> ( b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0)
c  in CNF:
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨  b^{42, 3}_2
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_1
c     b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨  b^{42, 3}_0
c  in DIMACS:
 16232  16233  16234  84  16235 0
 16232  16233  16234  84 -16236 0
 16232  16233  16234  84  16237 0

c  -1-1 --> -2
c    ( b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧  b^{42, 2}_0 ∧ -p_84) -> ( b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0)
c  in CNF:
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨  b^{42, 3}_2
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨  b^{42, 3}_1
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨  p_84 ∨ -b^{42, 3}_0
c  in DIMACS:
-16232  16233 -16234  84  16235 0
-16232  16233 -16234  84  16236 0
-16232  16233 -16234  84 -16237 0

c  -2-1 --> break 
c    ( b^{42, 2}_2 ∧  b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨  b^{42, 2}_0 ∨  p_84 ∨ break
c  in DIMACS:
-16232 -16233  16234  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 2}_2 ∧ -b^{42, 2}_1 ∧ -b^{42, 2}_0 ∧ true) 
c  in CNF:
c    -b^{42, 2}_2 ∨  b^{42, 2}_1 ∨  b^{42, 2}_0 ∨ false 
c  in DIMACS:
-16232  16233  16234  0

c  3 does not represent an automaton state.
c    -(-b^{42, 2}_2 ∧  b^{42, 2}_1 ∧  b^{42, 2}_0 ∧ true) 
c  in CNF:
c     b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ false 
c  in DIMACS:
 16232 -16233 -16234  0
c  -3 does not represent an automaton state.
c    -( b^{42, 2}_2 ∧  b^{42, 2}_1 ∧  b^{42, 2}_0 ∧ true) 
c  in CNF:
c    -b^{42, 2}_2 ∨ -b^{42, 2}_1 ∨ -b^{42, 2}_0 ∨ false 
c  in DIMACS:
-16232 -16233 -16234  0

c i = 3
c  -2+1 --> -1
c    ( b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧  p_126) -> ( b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0)
c  in CNF:
c    -b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨  b^{42, 4}_2
c    -b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_1
c    -b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨  b^{42, 4}_0
c  in DIMACS:
-16235 -16236  16237 -126  16238 0
-16235 -16236  16237 -126 -16239 0
-16235 -16236  16237 -126  16240 0

c  -1+1 --> 0
c    ( b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0 ∧  p_126) -> (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧ -b^{42, 4}_0)
c  in CNF:
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_2
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_1
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_0
c  in DIMACS:
-16235  16236 -16237 -126 -16238 0
-16235  16236 -16237 -126 -16239 0
-16235  16236 -16237 -126 -16240 0

c  0+1 --> 1
c    (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧  p_126) -> (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0)
c  in CNF:
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_2
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_1
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨  b^{42, 4}_0
c  in DIMACS:
 16235  16236  16237 -126 -16238 0
 16235  16236  16237 -126 -16239 0
 16235  16236  16237 -126  16240 0

c  1+1 --> 2
c    (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0 ∧  p_126) -> (-b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0)
c  in CNF:
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_2
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨  b^{42, 4}_1
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ -p_126 ∨ -b^{42, 4}_0
c  in DIMACS:
 16235  16236 -16237 -126 -16238 0
 16235  16236 -16237 -126  16239 0
 16235  16236 -16237 -126 -16240 0

c  2+1 --> break 
c    (-b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧  p_126) -> break
c  in CNF:
c     b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 16235 -16236  16237 -126 1162 0


c  2-1 --> 1
c    (-b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧ -p_126) -> (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0)
c  in CNF:
c     b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_2
c     b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_1
c     b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨  b^{42, 4}_0
c  in DIMACS:
 16235 -16236  16237  126 -16238 0
 16235 -16236  16237  126 -16239 0
 16235 -16236  16237  126  16240 0

c  1-1 --> 0
c    (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0 ∧ -p_126) -> (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧ -b^{42, 4}_0)
c  in CNF:
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_2
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_1
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_0
c  in DIMACS:
 16235  16236 -16237  126 -16238 0
 16235  16236 -16237  126 -16239 0
 16235  16236 -16237  126 -16240 0

c  0-1 --> -1
c    (-b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧ -p_126) -> ( b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0)
c  in CNF:
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨  b^{42, 4}_2
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_1
c     b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨  b^{42, 4}_0
c  in DIMACS:
 16235  16236  16237  126  16238 0
 16235  16236  16237  126 -16239 0
 16235  16236  16237  126  16240 0

c  -1-1 --> -2
c    ( b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧  b^{42, 3}_0 ∧ -p_126) -> ( b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0)
c  in CNF:
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨  b^{42, 4}_2
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨  b^{42, 4}_1
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨  p_126 ∨ -b^{42, 4}_0
c  in DIMACS:
-16235  16236 -16237  126  16238 0
-16235  16236 -16237  126  16239 0
-16235  16236 -16237  126 -16240 0

c  -2-1 --> break 
c    ( b^{42, 3}_2 ∧  b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨  b^{42, 3}_0 ∨  p_126 ∨ break
c  in DIMACS:
-16235 -16236  16237  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 3}_2 ∧ -b^{42, 3}_1 ∧ -b^{42, 3}_0 ∧ true) 
c  in CNF:
c    -b^{42, 3}_2 ∨  b^{42, 3}_1 ∨  b^{42, 3}_0 ∨ false 
c  in DIMACS:
-16235  16236  16237  0

c  3 does not represent an automaton state.
c    -(-b^{42, 3}_2 ∧  b^{42, 3}_1 ∧  b^{42, 3}_0 ∧ true) 
c  in CNF:
c     b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ false 
c  in DIMACS:
 16235 -16236 -16237  0
c  -3 does not represent an automaton state.
c    -( b^{42, 3}_2 ∧  b^{42, 3}_1 ∧  b^{42, 3}_0 ∧ true) 
c  in CNF:
c    -b^{42, 3}_2 ∨ -b^{42, 3}_1 ∨ -b^{42, 3}_0 ∨ false 
c  in DIMACS:
-16235 -16236 -16237  0

c i = 4
c  -2+1 --> -1
c    ( b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧  p_168) -> ( b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0)
c  in CNF:
c    -b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨  b^{42, 5}_2
c    -b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_1
c    -b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨  b^{42, 5}_0
c  in DIMACS:
-16238 -16239  16240 -168  16241 0
-16238 -16239  16240 -168 -16242 0
-16238 -16239  16240 -168  16243 0

c  -1+1 --> 0
c    ( b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0 ∧  p_168) -> (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧ -b^{42, 5}_0)
c  in CNF:
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_2
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_1
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_0
c  in DIMACS:
-16238  16239 -16240 -168 -16241 0
-16238  16239 -16240 -168 -16242 0
-16238  16239 -16240 -168 -16243 0

c  0+1 --> 1
c    (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧  p_168) -> (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0)
c  in CNF:
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_2
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_1
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨  b^{42, 5}_0
c  in DIMACS:
 16238  16239  16240 -168 -16241 0
 16238  16239  16240 -168 -16242 0
 16238  16239  16240 -168  16243 0

c  1+1 --> 2
c    (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0 ∧  p_168) -> (-b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0)
c  in CNF:
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_2
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨  b^{42, 5}_1
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ -p_168 ∨ -b^{42, 5}_0
c  in DIMACS:
 16238  16239 -16240 -168 -16241 0
 16238  16239 -16240 -168  16242 0
 16238  16239 -16240 -168 -16243 0

c  2+1 --> break 
c    (-b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧  p_168) -> break
c  in CNF:
c     b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 16238 -16239  16240 -168 1162 0


c  2-1 --> 1
c    (-b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧ -p_168) -> (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0)
c  in CNF:
c     b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_2
c     b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_1
c     b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨  b^{42, 5}_0
c  in DIMACS:
 16238 -16239  16240  168 -16241 0
 16238 -16239  16240  168 -16242 0
 16238 -16239  16240  168  16243 0

c  1-1 --> 0
c    (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0 ∧ -p_168) -> (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧ -b^{42, 5}_0)
c  in CNF:
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_2
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_1
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_0
c  in DIMACS:
 16238  16239 -16240  168 -16241 0
 16238  16239 -16240  168 -16242 0
 16238  16239 -16240  168 -16243 0

c  0-1 --> -1
c    (-b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧ -p_168) -> ( b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0)
c  in CNF:
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨  b^{42, 5}_2
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_1
c     b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨  b^{42, 5}_0
c  in DIMACS:
 16238  16239  16240  168  16241 0
 16238  16239  16240  168 -16242 0
 16238  16239  16240  168  16243 0

c  -1-1 --> -2
c    ( b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧  b^{42, 4}_0 ∧ -p_168) -> ( b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0)
c  in CNF:
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨  b^{42, 5}_2
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨  b^{42, 5}_1
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨  p_168 ∨ -b^{42, 5}_0
c  in DIMACS:
-16238  16239 -16240  168  16241 0
-16238  16239 -16240  168  16242 0
-16238  16239 -16240  168 -16243 0

c  -2-1 --> break 
c    ( b^{42, 4}_2 ∧  b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨  b^{42, 4}_0 ∨  p_168 ∨ break
c  in DIMACS:
-16238 -16239  16240  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 4}_2 ∧ -b^{42, 4}_1 ∧ -b^{42, 4}_0 ∧ true) 
c  in CNF:
c    -b^{42, 4}_2 ∨  b^{42, 4}_1 ∨  b^{42, 4}_0 ∨ false 
c  in DIMACS:
-16238  16239  16240  0

c  3 does not represent an automaton state.
c    -(-b^{42, 4}_2 ∧  b^{42, 4}_1 ∧  b^{42, 4}_0 ∧ true) 
c  in CNF:
c     b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ false 
c  in DIMACS:
 16238 -16239 -16240  0
c  -3 does not represent an automaton state.
c    -( b^{42, 4}_2 ∧  b^{42, 4}_1 ∧  b^{42, 4}_0 ∧ true) 
c  in CNF:
c    -b^{42, 4}_2 ∨ -b^{42, 4}_1 ∨ -b^{42, 4}_0 ∨ false 
c  in DIMACS:
-16238 -16239 -16240  0

c i = 5
c  -2+1 --> -1
c    ( b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧  p_210) -> ( b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0)
c  in CNF:
c    -b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨  b^{42, 6}_2
c    -b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_1
c    -b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨  b^{42, 6}_0
c  in DIMACS:
-16241 -16242  16243 -210  16244 0
-16241 -16242  16243 -210 -16245 0
-16241 -16242  16243 -210  16246 0

c  -1+1 --> 0
c    ( b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0 ∧  p_210) -> (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧ -b^{42, 6}_0)
c  in CNF:
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_2
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_1
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_0
c  in DIMACS:
-16241  16242 -16243 -210 -16244 0
-16241  16242 -16243 -210 -16245 0
-16241  16242 -16243 -210 -16246 0

c  0+1 --> 1
c    (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧  p_210) -> (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0)
c  in CNF:
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_2
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_1
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨  b^{42, 6}_0
c  in DIMACS:
 16241  16242  16243 -210 -16244 0
 16241  16242  16243 -210 -16245 0
 16241  16242  16243 -210  16246 0

c  1+1 --> 2
c    (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0 ∧  p_210) -> (-b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0)
c  in CNF:
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_2
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨  b^{42, 6}_1
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ -p_210 ∨ -b^{42, 6}_0
c  in DIMACS:
 16241  16242 -16243 -210 -16244 0
 16241  16242 -16243 -210  16245 0
 16241  16242 -16243 -210 -16246 0

c  2+1 --> break 
c    (-b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧  p_210) -> break
c  in CNF:
c     b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 16241 -16242  16243 -210 1162 0


c  2-1 --> 1
c    (-b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧ -p_210) -> (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0)
c  in CNF:
c     b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_2
c     b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_1
c     b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨  b^{42, 6}_0
c  in DIMACS:
 16241 -16242  16243  210 -16244 0
 16241 -16242  16243  210 -16245 0
 16241 -16242  16243  210  16246 0

c  1-1 --> 0
c    (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0 ∧ -p_210) -> (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧ -b^{42, 6}_0)
c  in CNF:
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_2
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_1
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_0
c  in DIMACS:
 16241  16242 -16243  210 -16244 0
 16241  16242 -16243  210 -16245 0
 16241  16242 -16243  210 -16246 0

c  0-1 --> -1
c    (-b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧ -p_210) -> ( b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0)
c  in CNF:
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨  b^{42, 6}_2
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_1
c     b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨  b^{42, 6}_0
c  in DIMACS:
 16241  16242  16243  210  16244 0
 16241  16242  16243  210 -16245 0
 16241  16242  16243  210  16246 0

c  -1-1 --> -2
c    ( b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧  b^{42, 5}_0 ∧ -p_210) -> ( b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0)
c  in CNF:
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨  b^{42, 6}_2
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨  b^{42, 6}_1
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨  p_210 ∨ -b^{42, 6}_0
c  in DIMACS:
-16241  16242 -16243  210  16244 0
-16241  16242 -16243  210  16245 0
-16241  16242 -16243  210 -16246 0

c  -2-1 --> break 
c    ( b^{42, 5}_2 ∧  b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨  b^{42, 5}_0 ∨  p_210 ∨ break
c  in DIMACS:
-16241 -16242  16243  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 5}_2 ∧ -b^{42, 5}_1 ∧ -b^{42, 5}_0 ∧ true) 
c  in CNF:
c    -b^{42, 5}_2 ∨  b^{42, 5}_1 ∨  b^{42, 5}_0 ∨ false 
c  in DIMACS:
-16241  16242  16243  0

c  3 does not represent an automaton state.
c    -(-b^{42, 5}_2 ∧  b^{42, 5}_1 ∧  b^{42, 5}_0 ∧ true) 
c  in CNF:
c     b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ false 
c  in DIMACS:
 16241 -16242 -16243  0
c  -3 does not represent an automaton state.
c    -( b^{42, 5}_2 ∧  b^{42, 5}_1 ∧  b^{42, 5}_0 ∧ true) 
c  in CNF:
c    -b^{42, 5}_2 ∨ -b^{42, 5}_1 ∨ -b^{42, 5}_0 ∨ false 
c  in DIMACS:
-16241 -16242 -16243  0

c i = 6
c  -2+1 --> -1
c    ( b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧  p_252) -> ( b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0)
c  in CNF:
c    -b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨  b^{42, 7}_2
c    -b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_1
c    -b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨  b^{42, 7}_0
c  in DIMACS:
-16244 -16245  16246 -252  16247 0
-16244 -16245  16246 -252 -16248 0
-16244 -16245  16246 -252  16249 0

c  -1+1 --> 0
c    ( b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0 ∧  p_252) -> (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧ -b^{42, 7}_0)
c  in CNF:
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_2
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_1
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_0
c  in DIMACS:
-16244  16245 -16246 -252 -16247 0
-16244  16245 -16246 -252 -16248 0
-16244  16245 -16246 -252 -16249 0

c  0+1 --> 1
c    (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧  p_252) -> (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0)
c  in CNF:
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_2
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_1
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨  b^{42, 7}_0
c  in DIMACS:
 16244  16245  16246 -252 -16247 0
 16244  16245  16246 -252 -16248 0
 16244  16245  16246 -252  16249 0

c  1+1 --> 2
c    (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0 ∧  p_252) -> (-b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0)
c  in CNF:
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_2
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨  b^{42, 7}_1
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ -p_252 ∨ -b^{42, 7}_0
c  in DIMACS:
 16244  16245 -16246 -252 -16247 0
 16244  16245 -16246 -252  16248 0
 16244  16245 -16246 -252 -16249 0

c  2+1 --> break 
c    (-b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧  p_252) -> break
c  in CNF:
c     b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 16244 -16245  16246 -252 1162 0


c  2-1 --> 1
c    (-b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧ -p_252) -> (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0)
c  in CNF:
c     b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_2
c     b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_1
c     b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨  b^{42, 7}_0
c  in DIMACS:
 16244 -16245  16246  252 -16247 0
 16244 -16245  16246  252 -16248 0
 16244 -16245  16246  252  16249 0

c  1-1 --> 0
c    (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0 ∧ -p_252) -> (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧ -b^{42, 7}_0)
c  in CNF:
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_2
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_1
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_0
c  in DIMACS:
 16244  16245 -16246  252 -16247 0
 16244  16245 -16246  252 -16248 0
 16244  16245 -16246  252 -16249 0

c  0-1 --> -1
c    (-b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧ -p_252) -> ( b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0)
c  in CNF:
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨  b^{42, 7}_2
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_1
c     b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨  b^{42, 7}_0
c  in DIMACS:
 16244  16245  16246  252  16247 0
 16244  16245  16246  252 -16248 0
 16244  16245  16246  252  16249 0

c  -1-1 --> -2
c    ( b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧  b^{42, 6}_0 ∧ -p_252) -> ( b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0)
c  in CNF:
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨  b^{42, 7}_2
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨  b^{42, 7}_1
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨  p_252 ∨ -b^{42, 7}_0
c  in DIMACS:
-16244  16245 -16246  252  16247 0
-16244  16245 -16246  252  16248 0
-16244  16245 -16246  252 -16249 0

c  -2-1 --> break 
c    ( b^{42, 6}_2 ∧  b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨  b^{42, 6}_0 ∨  p_252 ∨ break
c  in DIMACS:
-16244 -16245  16246  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 6}_2 ∧ -b^{42, 6}_1 ∧ -b^{42, 6}_0 ∧ true) 
c  in CNF:
c    -b^{42, 6}_2 ∨  b^{42, 6}_1 ∨  b^{42, 6}_0 ∨ false 
c  in DIMACS:
-16244  16245  16246  0

c  3 does not represent an automaton state.
c    -(-b^{42, 6}_2 ∧  b^{42, 6}_1 ∧  b^{42, 6}_0 ∧ true) 
c  in CNF:
c     b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ false 
c  in DIMACS:
 16244 -16245 -16246  0
c  -3 does not represent an automaton state.
c    -( b^{42, 6}_2 ∧  b^{42, 6}_1 ∧  b^{42, 6}_0 ∧ true) 
c  in CNF:
c    -b^{42, 6}_2 ∨ -b^{42, 6}_1 ∨ -b^{42, 6}_0 ∨ false 
c  in DIMACS:
-16244 -16245 -16246  0

c i = 7
c  -2+1 --> -1
c    ( b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧  p_294) -> ( b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0)
c  in CNF:
c    -b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨  b^{42, 8}_2
c    -b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_1
c    -b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨  b^{42, 8}_0
c  in DIMACS:
-16247 -16248  16249 -294  16250 0
-16247 -16248  16249 -294 -16251 0
-16247 -16248  16249 -294  16252 0

c  -1+1 --> 0
c    ( b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0 ∧  p_294) -> (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧ -b^{42, 8}_0)
c  in CNF:
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_2
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_1
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_0
c  in DIMACS:
-16247  16248 -16249 -294 -16250 0
-16247  16248 -16249 -294 -16251 0
-16247  16248 -16249 -294 -16252 0

c  0+1 --> 1
c    (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧  p_294) -> (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0)
c  in CNF:
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_2
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_1
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨  b^{42, 8}_0
c  in DIMACS:
 16247  16248  16249 -294 -16250 0
 16247  16248  16249 -294 -16251 0
 16247  16248  16249 -294  16252 0

c  1+1 --> 2
c    (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0 ∧  p_294) -> (-b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0)
c  in CNF:
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_2
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨  b^{42, 8}_1
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ -p_294 ∨ -b^{42, 8}_0
c  in DIMACS:
 16247  16248 -16249 -294 -16250 0
 16247  16248 -16249 -294  16251 0
 16247  16248 -16249 -294 -16252 0

c  2+1 --> break 
c    (-b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧  p_294) -> break
c  in CNF:
c     b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 16247 -16248  16249 -294 1162 0


c  2-1 --> 1
c    (-b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧ -p_294) -> (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0)
c  in CNF:
c     b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_2
c     b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_1
c     b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨  b^{42, 8}_0
c  in DIMACS:
 16247 -16248  16249  294 -16250 0
 16247 -16248  16249  294 -16251 0
 16247 -16248  16249  294  16252 0

c  1-1 --> 0
c    (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0 ∧ -p_294) -> (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧ -b^{42, 8}_0)
c  in CNF:
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_2
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_1
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_0
c  in DIMACS:
 16247  16248 -16249  294 -16250 0
 16247  16248 -16249  294 -16251 0
 16247  16248 -16249  294 -16252 0

c  0-1 --> -1
c    (-b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧ -p_294) -> ( b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0)
c  in CNF:
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨  b^{42, 8}_2
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_1
c     b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨  b^{42, 8}_0
c  in DIMACS:
 16247  16248  16249  294  16250 0
 16247  16248  16249  294 -16251 0
 16247  16248  16249  294  16252 0

c  -1-1 --> -2
c    ( b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧  b^{42, 7}_0 ∧ -p_294) -> ( b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0)
c  in CNF:
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨  b^{42, 8}_2
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨  b^{42, 8}_1
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨  p_294 ∨ -b^{42, 8}_0
c  in DIMACS:
-16247  16248 -16249  294  16250 0
-16247  16248 -16249  294  16251 0
-16247  16248 -16249  294 -16252 0

c  -2-1 --> break 
c    ( b^{42, 7}_2 ∧  b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨  b^{42, 7}_0 ∨  p_294 ∨ break
c  in DIMACS:
-16247 -16248  16249  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 7}_2 ∧ -b^{42, 7}_1 ∧ -b^{42, 7}_0 ∧ true) 
c  in CNF:
c    -b^{42, 7}_2 ∨  b^{42, 7}_1 ∨  b^{42, 7}_0 ∨ false 
c  in DIMACS:
-16247  16248  16249  0

c  3 does not represent an automaton state.
c    -(-b^{42, 7}_2 ∧  b^{42, 7}_1 ∧  b^{42, 7}_0 ∧ true) 
c  in CNF:
c     b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ false 
c  in DIMACS:
 16247 -16248 -16249  0
c  -3 does not represent an automaton state.
c    -( b^{42, 7}_2 ∧  b^{42, 7}_1 ∧  b^{42, 7}_0 ∧ true) 
c  in CNF:
c    -b^{42, 7}_2 ∨ -b^{42, 7}_1 ∨ -b^{42, 7}_0 ∨ false 
c  in DIMACS:
-16247 -16248 -16249  0

c i = 8
c  -2+1 --> -1
c    ( b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧  p_336) -> ( b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0)
c  in CNF:
c    -b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨  b^{42, 9}_2
c    -b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_1
c    -b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨  b^{42, 9}_0
c  in DIMACS:
-16250 -16251  16252 -336  16253 0
-16250 -16251  16252 -336 -16254 0
-16250 -16251  16252 -336  16255 0

c  -1+1 --> 0
c    ( b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0 ∧  p_336) -> (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧ -b^{42, 9}_0)
c  in CNF:
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_2
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_1
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_0
c  in DIMACS:
-16250  16251 -16252 -336 -16253 0
-16250  16251 -16252 -336 -16254 0
-16250  16251 -16252 -336 -16255 0

c  0+1 --> 1
c    (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧  p_336) -> (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0)
c  in CNF:
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_2
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_1
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨  b^{42, 9}_0
c  in DIMACS:
 16250  16251  16252 -336 -16253 0
 16250  16251  16252 -336 -16254 0
 16250  16251  16252 -336  16255 0

c  1+1 --> 2
c    (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0 ∧  p_336) -> (-b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0)
c  in CNF:
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_2
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨  b^{42, 9}_1
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ -p_336 ∨ -b^{42, 9}_0
c  in DIMACS:
 16250  16251 -16252 -336 -16253 0
 16250  16251 -16252 -336  16254 0
 16250  16251 -16252 -336 -16255 0

c  2+1 --> break 
c    (-b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧  p_336) -> break
c  in CNF:
c     b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 16250 -16251  16252 -336 1162 0


c  2-1 --> 1
c    (-b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧ -p_336) -> (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0)
c  in CNF:
c     b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_2
c     b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_1
c     b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨  b^{42, 9}_0
c  in DIMACS:
 16250 -16251  16252  336 -16253 0
 16250 -16251  16252  336 -16254 0
 16250 -16251  16252  336  16255 0

c  1-1 --> 0
c    (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0 ∧ -p_336) -> (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧ -b^{42, 9}_0)
c  in CNF:
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_2
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_1
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_0
c  in DIMACS:
 16250  16251 -16252  336 -16253 0
 16250  16251 -16252  336 -16254 0
 16250  16251 -16252  336 -16255 0

c  0-1 --> -1
c    (-b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧ -p_336) -> ( b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0)
c  in CNF:
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨  b^{42, 9}_2
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_1
c     b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨  b^{42, 9}_0
c  in DIMACS:
 16250  16251  16252  336  16253 0
 16250  16251  16252  336 -16254 0
 16250  16251  16252  336  16255 0

c  -1-1 --> -2
c    ( b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧  b^{42, 8}_0 ∧ -p_336) -> ( b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0)
c  in CNF:
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨  b^{42, 9}_2
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨  b^{42, 9}_1
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨  p_336 ∨ -b^{42, 9}_0
c  in DIMACS:
-16250  16251 -16252  336  16253 0
-16250  16251 -16252  336  16254 0
-16250  16251 -16252  336 -16255 0

c  -2-1 --> break 
c    ( b^{42, 8}_2 ∧  b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨  b^{42, 8}_0 ∨  p_336 ∨ break
c  in DIMACS:
-16250 -16251  16252  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 8}_2 ∧ -b^{42, 8}_1 ∧ -b^{42, 8}_0 ∧ true) 
c  in CNF:
c    -b^{42, 8}_2 ∨  b^{42, 8}_1 ∨  b^{42, 8}_0 ∨ false 
c  in DIMACS:
-16250  16251  16252  0

c  3 does not represent an automaton state.
c    -(-b^{42, 8}_2 ∧  b^{42, 8}_1 ∧  b^{42, 8}_0 ∧ true) 
c  in CNF:
c     b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ false 
c  in DIMACS:
 16250 -16251 -16252  0
c  -3 does not represent an automaton state.
c    -( b^{42, 8}_2 ∧  b^{42, 8}_1 ∧  b^{42, 8}_0 ∧ true) 
c  in CNF:
c    -b^{42, 8}_2 ∨ -b^{42, 8}_1 ∨ -b^{42, 8}_0 ∨ false 
c  in DIMACS:
-16250 -16251 -16252  0

c i = 9
c  -2+1 --> -1
c    ( b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧  p_378) -> ( b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0)
c  in CNF:
c    -b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨  b^{42, 10}_2
c    -b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_1
c    -b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨  b^{42, 10}_0
c  in DIMACS:
-16253 -16254  16255 -378  16256 0
-16253 -16254  16255 -378 -16257 0
-16253 -16254  16255 -378  16258 0

c  -1+1 --> 0
c    ( b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0 ∧  p_378) -> (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧ -b^{42, 10}_0)
c  in CNF:
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_2
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_1
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_0
c  in DIMACS:
-16253  16254 -16255 -378 -16256 0
-16253  16254 -16255 -378 -16257 0
-16253  16254 -16255 -378 -16258 0

c  0+1 --> 1
c    (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧  p_378) -> (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0)
c  in CNF:
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_2
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_1
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨  b^{42, 10}_0
c  in DIMACS:
 16253  16254  16255 -378 -16256 0
 16253  16254  16255 -378 -16257 0
 16253  16254  16255 -378  16258 0

c  1+1 --> 2
c    (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0 ∧  p_378) -> (-b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0)
c  in CNF:
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_2
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨  b^{42, 10}_1
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ -p_378 ∨ -b^{42, 10}_0
c  in DIMACS:
 16253  16254 -16255 -378 -16256 0
 16253  16254 -16255 -378  16257 0
 16253  16254 -16255 -378 -16258 0

c  2+1 --> break 
c    (-b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧  p_378) -> break
c  in CNF:
c     b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 16253 -16254  16255 -378 1162 0


c  2-1 --> 1
c    (-b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧ -p_378) -> (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0)
c  in CNF:
c     b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_2
c     b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_1
c     b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨  b^{42, 10}_0
c  in DIMACS:
 16253 -16254  16255  378 -16256 0
 16253 -16254  16255  378 -16257 0
 16253 -16254  16255  378  16258 0

c  1-1 --> 0
c    (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0 ∧ -p_378) -> (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧ -b^{42, 10}_0)
c  in CNF:
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_2
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_1
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_0
c  in DIMACS:
 16253  16254 -16255  378 -16256 0
 16253  16254 -16255  378 -16257 0
 16253  16254 -16255  378 -16258 0

c  0-1 --> -1
c    (-b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧ -p_378) -> ( b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0)
c  in CNF:
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨  b^{42, 10}_2
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_1
c     b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨  b^{42, 10}_0
c  in DIMACS:
 16253  16254  16255  378  16256 0
 16253  16254  16255  378 -16257 0
 16253  16254  16255  378  16258 0

c  -1-1 --> -2
c    ( b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧  b^{42, 9}_0 ∧ -p_378) -> ( b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0)
c  in CNF:
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨  b^{42, 10}_2
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨  b^{42, 10}_1
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨  p_378 ∨ -b^{42, 10}_0
c  in DIMACS:
-16253  16254 -16255  378  16256 0
-16253  16254 -16255  378  16257 0
-16253  16254 -16255  378 -16258 0

c  -2-1 --> break 
c    ( b^{42, 9}_2 ∧  b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨  b^{42, 9}_0 ∨  p_378 ∨ break
c  in DIMACS:
-16253 -16254  16255  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 9}_2 ∧ -b^{42, 9}_1 ∧ -b^{42, 9}_0 ∧ true) 
c  in CNF:
c    -b^{42, 9}_2 ∨  b^{42, 9}_1 ∨  b^{42, 9}_0 ∨ false 
c  in DIMACS:
-16253  16254  16255  0

c  3 does not represent an automaton state.
c    -(-b^{42, 9}_2 ∧  b^{42, 9}_1 ∧  b^{42, 9}_0 ∧ true) 
c  in CNF:
c     b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ false 
c  in DIMACS:
 16253 -16254 -16255  0
c  -3 does not represent an automaton state.
c    -( b^{42, 9}_2 ∧  b^{42, 9}_1 ∧  b^{42, 9}_0 ∧ true) 
c  in CNF:
c    -b^{42, 9}_2 ∨ -b^{42, 9}_1 ∨ -b^{42, 9}_0 ∨ false 
c  in DIMACS:
-16253 -16254 -16255  0

c i = 10
c  -2+1 --> -1
c    ( b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧  p_420) -> ( b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0)
c  in CNF:
c    -b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨  b^{42, 11}_2
c    -b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_1
c    -b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨  b^{42, 11}_0
c  in DIMACS:
-16256 -16257  16258 -420  16259 0
-16256 -16257  16258 -420 -16260 0
-16256 -16257  16258 -420  16261 0

c  -1+1 --> 0
c    ( b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0 ∧  p_420) -> (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧ -b^{42, 11}_0)
c  in CNF:
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_2
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_1
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_0
c  in DIMACS:
-16256  16257 -16258 -420 -16259 0
-16256  16257 -16258 -420 -16260 0
-16256  16257 -16258 -420 -16261 0

c  0+1 --> 1
c    (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧  p_420) -> (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0)
c  in CNF:
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_2
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_1
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨  b^{42, 11}_0
c  in DIMACS:
 16256  16257  16258 -420 -16259 0
 16256  16257  16258 -420 -16260 0
 16256  16257  16258 -420  16261 0

c  1+1 --> 2
c    (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0 ∧  p_420) -> (-b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0)
c  in CNF:
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_2
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨  b^{42, 11}_1
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ -p_420 ∨ -b^{42, 11}_0
c  in DIMACS:
 16256  16257 -16258 -420 -16259 0
 16256  16257 -16258 -420  16260 0
 16256  16257 -16258 -420 -16261 0

c  2+1 --> break 
c    (-b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧  p_420) -> break
c  in CNF:
c     b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 16256 -16257  16258 -420 1162 0


c  2-1 --> 1
c    (-b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧ -p_420) -> (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0)
c  in CNF:
c     b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_2
c     b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_1
c     b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨  b^{42, 11}_0
c  in DIMACS:
 16256 -16257  16258  420 -16259 0
 16256 -16257  16258  420 -16260 0
 16256 -16257  16258  420  16261 0

c  1-1 --> 0
c    (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0 ∧ -p_420) -> (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧ -b^{42, 11}_0)
c  in CNF:
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_2
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_1
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_0
c  in DIMACS:
 16256  16257 -16258  420 -16259 0
 16256  16257 -16258  420 -16260 0
 16256  16257 -16258  420 -16261 0

c  0-1 --> -1
c    (-b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧ -p_420) -> ( b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0)
c  in CNF:
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨  b^{42, 11}_2
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_1
c     b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨  b^{42, 11}_0
c  in DIMACS:
 16256  16257  16258  420  16259 0
 16256  16257  16258  420 -16260 0
 16256  16257  16258  420  16261 0

c  -1-1 --> -2
c    ( b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧  b^{42, 10}_0 ∧ -p_420) -> ( b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0)
c  in CNF:
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨  b^{42, 11}_2
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨  b^{42, 11}_1
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨  p_420 ∨ -b^{42, 11}_0
c  in DIMACS:
-16256  16257 -16258  420  16259 0
-16256  16257 -16258  420  16260 0
-16256  16257 -16258  420 -16261 0

c  -2-1 --> break 
c    ( b^{42, 10}_2 ∧  b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨  b^{42, 10}_0 ∨  p_420 ∨ break
c  in DIMACS:
-16256 -16257  16258  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 10}_2 ∧ -b^{42, 10}_1 ∧ -b^{42, 10}_0 ∧ true) 
c  in CNF:
c    -b^{42, 10}_2 ∨  b^{42, 10}_1 ∨  b^{42, 10}_0 ∨ false 
c  in DIMACS:
-16256  16257  16258  0

c  3 does not represent an automaton state.
c    -(-b^{42, 10}_2 ∧  b^{42, 10}_1 ∧  b^{42, 10}_0 ∧ true) 
c  in CNF:
c     b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ false 
c  in DIMACS:
 16256 -16257 -16258  0
c  -3 does not represent an automaton state.
c    -( b^{42, 10}_2 ∧  b^{42, 10}_1 ∧  b^{42, 10}_0 ∧ true) 
c  in CNF:
c    -b^{42, 10}_2 ∨ -b^{42, 10}_1 ∨ -b^{42, 10}_0 ∨ false 
c  in DIMACS:
-16256 -16257 -16258  0

c i = 11
c  -2+1 --> -1
c    ( b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧  p_462) -> ( b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0)
c  in CNF:
c    -b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨  b^{42, 12}_2
c    -b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_1
c    -b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨  b^{42, 12}_0
c  in DIMACS:
-16259 -16260  16261 -462  16262 0
-16259 -16260  16261 -462 -16263 0
-16259 -16260  16261 -462  16264 0

c  -1+1 --> 0
c    ( b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0 ∧  p_462) -> (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧ -b^{42, 12}_0)
c  in CNF:
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_2
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_1
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_0
c  in DIMACS:
-16259  16260 -16261 -462 -16262 0
-16259  16260 -16261 -462 -16263 0
-16259  16260 -16261 -462 -16264 0

c  0+1 --> 1
c    (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧  p_462) -> (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0)
c  in CNF:
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_2
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_1
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨  b^{42, 12}_0
c  in DIMACS:
 16259  16260  16261 -462 -16262 0
 16259  16260  16261 -462 -16263 0
 16259  16260  16261 -462  16264 0

c  1+1 --> 2
c    (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0 ∧  p_462) -> (-b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0)
c  in CNF:
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_2
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨  b^{42, 12}_1
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ -p_462 ∨ -b^{42, 12}_0
c  in DIMACS:
 16259  16260 -16261 -462 -16262 0
 16259  16260 -16261 -462  16263 0
 16259  16260 -16261 -462 -16264 0

c  2+1 --> break 
c    (-b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧  p_462) -> break
c  in CNF:
c     b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 16259 -16260  16261 -462 1162 0


c  2-1 --> 1
c    (-b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧ -p_462) -> (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0)
c  in CNF:
c     b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_2
c     b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_1
c     b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨  b^{42, 12}_0
c  in DIMACS:
 16259 -16260  16261  462 -16262 0
 16259 -16260  16261  462 -16263 0
 16259 -16260  16261  462  16264 0

c  1-1 --> 0
c    (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0 ∧ -p_462) -> (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧ -b^{42, 12}_0)
c  in CNF:
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_2
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_1
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_0
c  in DIMACS:
 16259  16260 -16261  462 -16262 0
 16259  16260 -16261  462 -16263 0
 16259  16260 -16261  462 -16264 0

c  0-1 --> -1
c    (-b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧ -p_462) -> ( b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0)
c  in CNF:
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨  b^{42, 12}_2
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_1
c     b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨  b^{42, 12}_0
c  in DIMACS:
 16259  16260  16261  462  16262 0
 16259  16260  16261  462 -16263 0
 16259  16260  16261  462  16264 0

c  -1-1 --> -2
c    ( b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧  b^{42, 11}_0 ∧ -p_462) -> ( b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0)
c  in CNF:
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨  b^{42, 12}_2
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨  b^{42, 12}_1
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨  p_462 ∨ -b^{42, 12}_0
c  in DIMACS:
-16259  16260 -16261  462  16262 0
-16259  16260 -16261  462  16263 0
-16259  16260 -16261  462 -16264 0

c  -2-1 --> break 
c    ( b^{42, 11}_2 ∧  b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨  b^{42, 11}_0 ∨  p_462 ∨ break
c  in DIMACS:
-16259 -16260  16261  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 11}_2 ∧ -b^{42, 11}_1 ∧ -b^{42, 11}_0 ∧ true) 
c  in CNF:
c    -b^{42, 11}_2 ∨  b^{42, 11}_1 ∨  b^{42, 11}_0 ∨ false 
c  in DIMACS:
-16259  16260  16261  0

c  3 does not represent an automaton state.
c    -(-b^{42, 11}_2 ∧  b^{42, 11}_1 ∧  b^{42, 11}_0 ∧ true) 
c  in CNF:
c     b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ false 
c  in DIMACS:
 16259 -16260 -16261  0
c  -3 does not represent an automaton state.
c    -( b^{42, 11}_2 ∧  b^{42, 11}_1 ∧  b^{42, 11}_0 ∧ true) 
c  in CNF:
c    -b^{42, 11}_2 ∨ -b^{42, 11}_1 ∨ -b^{42, 11}_0 ∨ false 
c  in DIMACS:
-16259 -16260 -16261  0

c i = 12
c  -2+1 --> -1
c    ( b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧  p_504) -> ( b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0)
c  in CNF:
c    -b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨  b^{42, 13}_2
c    -b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_1
c    -b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨  b^{42, 13}_0
c  in DIMACS:
-16262 -16263  16264 -504  16265 0
-16262 -16263  16264 -504 -16266 0
-16262 -16263  16264 -504  16267 0

c  -1+1 --> 0
c    ( b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0 ∧  p_504) -> (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧ -b^{42, 13}_0)
c  in CNF:
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_2
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_1
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_0
c  in DIMACS:
-16262  16263 -16264 -504 -16265 0
-16262  16263 -16264 -504 -16266 0
-16262  16263 -16264 -504 -16267 0

c  0+1 --> 1
c    (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧  p_504) -> (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0)
c  in CNF:
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_2
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_1
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨  b^{42, 13}_0
c  in DIMACS:
 16262  16263  16264 -504 -16265 0
 16262  16263  16264 -504 -16266 0
 16262  16263  16264 -504  16267 0

c  1+1 --> 2
c    (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0 ∧  p_504) -> (-b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0)
c  in CNF:
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_2
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨  b^{42, 13}_1
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ -p_504 ∨ -b^{42, 13}_0
c  in DIMACS:
 16262  16263 -16264 -504 -16265 0
 16262  16263 -16264 -504  16266 0
 16262  16263 -16264 -504 -16267 0

c  2+1 --> break 
c    (-b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧  p_504) -> break
c  in CNF:
c     b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 16262 -16263  16264 -504 1162 0


c  2-1 --> 1
c    (-b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧ -p_504) -> (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0)
c  in CNF:
c     b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_2
c     b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_1
c     b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨  b^{42, 13}_0
c  in DIMACS:
 16262 -16263  16264  504 -16265 0
 16262 -16263  16264  504 -16266 0
 16262 -16263  16264  504  16267 0

c  1-1 --> 0
c    (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0 ∧ -p_504) -> (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧ -b^{42, 13}_0)
c  in CNF:
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_2
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_1
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_0
c  in DIMACS:
 16262  16263 -16264  504 -16265 0
 16262  16263 -16264  504 -16266 0
 16262  16263 -16264  504 -16267 0

c  0-1 --> -1
c    (-b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧ -p_504) -> ( b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0)
c  in CNF:
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨  b^{42, 13}_2
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_1
c     b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨  b^{42, 13}_0
c  in DIMACS:
 16262  16263  16264  504  16265 0
 16262  16263  16264  504 -16266 0
 16262  16263  16264  504  16267 0

c  -1-1 --> -2
c    ( b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧  b^{42, 12}_0 ∧ -p_504) -> ( b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0)
c  in CNF:
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨  b^{42, 13}_2
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨  b^{42, 13}_1
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨  p_504 ∨ -b^{42, 13}_0
c  in DIMACS:
-16262  16263 -16264  504  16265 0
-16262  16263 -16264  504  16266 0
-16262  16263 -16264  504 -16267 0

c  -2-1 --> break 
c    ( b^{42, 12}_2 ∧  b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨  b^{42, 12}_0 ∨  p_504 ∨ break
c  in DIMACS:
-16262 -16263  16264  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 12}_2 ∧ -b^{42, 12}_1 ∧ -b^{42, 12}_0 ∧ true) 
c  in CNF:
c    -b^{42, 12}_2 ∨  b^{42, 12}_1 ∨  b^{42, 12}_0 ∨ false 
c  in DIMACS:
-16262  16263  16264  0

c  3 does not represent an automaton state.
c    -(-b^{42, 12}_2 ∧  b^{42, 12}_1 ∧  b^{42, 12}_0 ∧ true) 
c  in CNF:
c     b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ false 
c  in DIMACS:
 16262 -16263 -16264  0
c  -3 does not represent an automaton state.
c    -( b^{42, 12}_2 ∧  b^{42, 12}_1 ∧  b^{42, 12}_0 ∧ true) 
c  in CNF:
c    -b^{42, 12}_2 ∨ -b^{42, 12}_1 ∨ -b^{42, 12}_0 ∨ false 
c  in DIMACS:
-16262 -16263 -16264  0

c i = 13
c  -2+1 --> -1
c    ( b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧  p_546) -> ( b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0)
c  in CNF:
c    -b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨  b^{42, 14}_2
c    -b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_1
c    -b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨  b^{42, 14}_0
c  in DIMACS:
-16265 -16266  16267 -546  16268 0
-16265 -16266  16267 -546 -16269 0
-16265 -16266  16267 -546  16270 0

c  -1+1 --> 0
c    ( b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0 ∧  p_546) -> (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧ -b^{42, 14}_0)
c  in CNF:
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_2
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_1
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_0
c  in DIMACS:
-16265  16266 -16267 -546 -16268 0
-16265  16266 -16267 -546 -16269 0
-16265  16266 -16267 -546 -16270 0

c  0+1 --> 1
c    (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧  p_546) -> (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0)
c  in CNF:
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_2
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_1
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨  b^{42, 14}_0
c  in DIMACS:
 16265  16266  16267 -546 -16268 0
 16265  16266  16267 -546 -16269 0
 16265  16266  16267 -546  16270 0

c  1+1 --> 2
c    (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0 ∧  p_546) -> (-b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0)
c  in CNF:
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_2
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨  b^{42, 14}_1
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ -p_546 ∨ -b^{42, 14}_0
c  in DIMACS:
 16265  16266 -16267 -546 -16268 0
 16265  16266 -16267 -546  16269 0
 16265  16266 -16267 -546 -16270 0

c  2+1 --> break 
c    (-b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧  p_546) -> break
c  in CNF:
c     b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 16265 -16266  16267 -546 1162 0


c  2-1 --> 1
c    (-b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧ -p_546) -> (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0)
c  in CNF:
c     b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_2
c     b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_1
c     b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨  b^{42, 14}_0
c  in DIMACS:
 16265 -16266  16267  546 -16268 0
 16265 -16266  16267  546 -16269 0
 16265 -16266  16267  546  16270 0

c  1-1 --> 0
c    (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0 ∧ -p_546) -> (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧ -b^{42, 14}_0)
c  in CNF:
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_2
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_1
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_0
c  in DIMACS:
 16265  16266 -16267  546 -16268 0
 16265  16266 -16267  546 -16269 0
 16265  16266 -16267  546 -16270 0

c  0-1 --> -1
c    (-b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧ -p_546) -> ( b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0)
c  in CNF:
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨  b^{42, 14}_2
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_1
c     b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨  b^{42, 14}_0
c  in DIMACS:
 16265  16266  16267  546  16268 0
 16265  16266  16267  546 -16269 0
 16265  16266  16267  546  16270 0

c  -1-1 --> -2
c    ( b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧  b^{42, 13}_0 ∧ -p_546) -> ( b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0)
c  in CNF:
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨  b^{42, 14}_2
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨  b^{42, 14}_1
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨  p_546 ∨ -b^{42, 14}_0
c  in DIMACS:
-16265  16266 -16267  546  16268 0
-16265  16266 -16267  546  16269 0
-16265  16266 -16267  546 -16270 0

c  -2-1 --> break 
c    ( b^{42, 13}_2 ∧  b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨  b^{42, 13}_0 ∨  p_546 ∨ break
c  in DIMACS:
-16265 -16266  16267  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 13}_2 ∧ -b^{42, 13}_1 ∧ -b^{42, 13}_0 ∧ true) 
c  in CNF:
c    -b^{42, 13}_2 ∨  b^{42, 13}_1 ∨  b^{42, 13}_0 ∨ false 
c  in DIMACS:
-16265  16266  16267  0

c  3 does not represent an automaton state.
c    -(-b^{42, 13}_2 ∧  b^{42, 13}_1 ∧  b^{42, 13}_0 ∧ true) 
c  in CNF:
c     b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ false 
c  in DIMACS:
 16265 -16266 -16267  0
c  -3 does not represent an automaton state.
c    -( b^{42, 13}_2 ∧  b^{42, 13}_1 ∧  b^{42, 13}_0 ∧ true) 
c  in CNF:
c    -b^{42, 13}_2 ∨ -b^{42, 13}_1 ∨ -b^{42, 13}_0 ∨ false 
c  in DIMACS:
-16265 -16266 -16267  0

c i = 14
c  -2+1 --> -1
c    ( b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧  p_588) -> ( b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0)
c  in CNF:
c    -b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨  b^{42, 15}_2
c    -b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_1
c    -b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨  b^{42, 15}_0
c  in DIMACS:
-16268 -16269  16270 -588  16271 0
-16268 -16269  16270 -588 -16272 0
-16268 -16269  16270 -588  16273 0

c  -1+1 --> 0
c    ( b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0 ∧  p_588) -> (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧ -b^{42, 15}_0)
c  in CNF:
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_2
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_1
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_0
c  in DIMACS:
-16268  16269 -16270 -588 -16271 0
-16268  16269 -16270 -588 -16272 0
-16268  16269 -16270 -588 -16273 0

c  0+1 --> 1
c    (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧  p_588) -> (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0)
c  in CNF:
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_2
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_1
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨  b^{42, 15}_0
c  in DIMACS:
 16268  16269  16270 -588 -16271 0
 16268  16269  16270 -588 -16272 0
 16268  16269  16270 -588  16273 0

c  1+1 --> 2
c    (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0 ∧  p_588) -> (-b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0)
c  in CNF:
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_2
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨  b^{42, 15}_1
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ -p_588 ∨ -b^{42, 15}_0
c  in DIMACS:
 16268  16269 -16270 -588 -16271 0
 16268  16269 -16270 -588  16272 0
 16268  16269 -16270 -588 -16273 0

c  2+1 --> break 
c    (-b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧  p_588) -> break
c  in CNF:
c     b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 16268 -16269  16270 -588 1162 0


c  2-1 --> 1
c    (-b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧ -p_588) -> (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0)
c  in CNF:
c     b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_2
c     b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_1
c     b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨  b^{42, 15}_0
c  in DIMACS:
 16268 -16269  16270  588 -16271 0
 16268 -16269  16270  588 -16272 0
 16268 -16269  16270  588  16273 0

c  1-1 --> 0
c    (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0 ∧ -p_588) -> (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧ -b^{42, 15}_0)
c  in CNF:
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_2
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_1
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_0
c  in DIMACS:
 16268  16269 -16270  588 -16271 0
 16268  16269 -16270  588 -16272 0
 16268  16269 -16270  588 -16273 0

c  0-1 --> -1
c    (-b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧ -p_588) -> ( b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0)
c  in CNF:
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨  b^{42, 15}_2
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_1
c     b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨  b^{42, 15}_0
c  in DIMACS:
 16268  16269  16270  588  16271 0
 16268  16269  16270  588 -16272 0
 16268  16269  16270  588  16273 0

c  -1-1 --> -2
c    ( b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧  b^{42, 14}_0 ∧ -p_588) -> ( b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0)
c  in CNF:
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨  b^{42, 15}_2
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨  b^{42, 15}_1
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨  p_588 ∨ -b^{42, 15}_0
c  in DIMACS:
-16268  16269 -16270  588  16271 0
-16268  16269 -16270  588  16272 0
-16268  16269 -16270  588 -16273 0

c  -2-1 --> break 
c    ( b^{42, 14}_2 ∧  b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨  b^{42, 14}_0 ∨  p_588 ∨ break
c  in DIMACS:
-16268 -16269  16270  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 14}_2 ∧ -b^{42, 14}_1 ∧ -b^{42, 14}_0 ∧ true) 
c  in CNF:
c    -b^{42, 14}_2 ∨  b^{42, 14}_1 ∨  b^{42, 14}_0 ∨ false 
c  in DIMACS:
-16268  16269  16270  0

c  3 does not represent an automaton state.
c    -(-b^{42, 14}_2 ∧  b^{42, 14}_1 ∧  b^{42, 14}_0 ∧ true) 
c  in CNF:
c     b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ false 
c  in DIMACS:
 16268 -16269 -16270  0
c  -3 does not represent an automaton state.
c    -( b^{42, 14}_2 ∧  b^{42, 14}_1 ∧  b^{42, 14}_0 ∧ true) 
c  in CNF:
c    -b^{42, 14}_2 ∨ -b^{42, 14}_1 ∨ -b^{42, 14}_0 ∨ false 
c  in DIMACS:
-16268 -16269 -16270  0

c i = 15
c  -2+1 --> -1
c    ( b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧  p_630) -> ( b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0)
c  in CNF:
c    -b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨  b^{42, 16}_2
c    -b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_1
c    -b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨  b^{42, 16}_0
c  in DIMACS:
-16271 -16272  16273 -630  16274 0
-16271 -16272  16273 -630 -16275 0
-16271 -16272  16273 -630  16276 0

c  -1+1 --> 0
c    ( b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0 ∧  p_630) -> (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧ -b^{42, 16}_0)
c  in CNF:
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_2
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_1
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_0
c  in DIMACS:
-16271  16272 -16273 -630 -16274 0
-16271  16272 -16273 -630 -16275 0
-16271  16272 -16273 -630 -16276 0

c  0+1 --> 1
c    (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧  p_630) -> (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0)
c  in CNF:
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_2
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_1
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨  b^{42, 16}_0
c  in DIMACS:
 16271  16272  16273 -630 -16274 0
 16271  16272  16273 -630 -16275 0
 16271  16272  16273 -630  16276 0

c  1+1 --> 2
c    (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0 ∧  p_630) -> (-b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0)
c  in CNF:
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_2
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨  b^{42, 16}_1
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ -p_630 ∨ -b^{42, 16}_0
c  in DIMACS:
 16271  16272 -16273 -630 -16274 0
 16271  16272 -16273 -630  16275 0
 16271  16272 -16273 -630 -16276 0

c  2+1 --> break 
c    (-b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧  p_630) -> break
c  in CNF:
c     b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 16271 -16272  16273 -630 1162 0


c  2-1 --> 1
c    (-b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧ -p_630) -> (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0)
c  in CNF:
c     b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_2
c     b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_1
c     b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨  b^{42, 16}_0
c  in DIMACS:
 16271 -16272  16273  630 -16274 0
 16271 -16272  16273  630 -16275 0
 16271 -16272  16273  630  16276 0

c  1-1 --> 0
c    (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0 ∧ -p_630) -> (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧ -b^{42, 16}_0)
c  in CNF:
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_2
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_1
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_0
c  in DIMACS:
 16271  16272 -16273  630 -16274 0
 16271  16272 -16273  630 -16275 0
 16271  16272 -16273  630 -16276 0

c  0-1 --> -1
c    (-b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧ -p_630) -> ( b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0)
c  in CNF:
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨  b^{42, 16}_2
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_1
c     b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨  b^{42, 16}_0
c  in DIMACS:
 16271  16272  16273  630  16274 0
 16271  16272  16273  630 -16275 0
 16271  16272  16273  630  16276 0

c  -1-1 --> -2
c    ( b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧  b^{42, 15}_0 ∧ -p_630) -> ( b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0)
c  in CNF:
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨  b^{42, 16}_2
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨  b^{42, 16}_1
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨  p_630 ∨ -b^{42, 16}_0
c  in DIMACS:
-16271  16272 -16273  630  16274 0
-16271  16272 -16273  630  16275 0
-16271  16272 -16273  630 -16276 0

c  -2-1 --> break 
c    ( b^{42, 15}_2 ∧  b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨  b^{42, 15}_0 ∨  p_630 ∨ break
c  in DIMACS:
-16271 -16272  16273  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 15}_2 ∧ -b^{42, 15}_1 ∧ -b^{42, 15}_0 ∧ true) 
c  in CNF:
c    -b^{42, 15}_2 ∨  b^{42, 15}_1 ∨  b^{42, 15}_0 ∨ false 
c  in DIMACS:
-16271  16272  16273  0

c  3 does not represent an automaton state.
c    -(-b^{42, 15}_2 ∧  b^{42, 15}_1 ∧  b^{42, 15}_0 ∧ true) 
c  in CNF:
c     b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ false 
c  in DIMACS:
 16271 -16272 -16273  0
c  -3 does not represent an automaton state.
c    -( b^{42, 15}_2 ∧  b^{42, 15}_1 ∧  b^{42, 15}_0 ∧ true) 
c  in CNF:
c    -b^{42, 15}_2 ∨ -b^{42, 15}_1 ∨ -b^{42, 15}_0 ∨ false 
c  in DIMACS:
-16271 -16272 -16273  0

c i = 16
c  -2+1 --> -1
c    ( b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧  p_672) -> ( b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0)
c  in CNF:
c    -b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨  b^{42, 17}_2
c    -b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_1
c    -b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨  b^{42, 17}_0
c  in DIMACS:
-16274 -16275  16276 -672  16277 0
-16274 -16275  16276 -672 -16278 0
-16274 -16275  16276 -672  16279 0

c  -1+1 --> 0
c    ( b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0 ∧  p_672) -> (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧ -b^{42, 17}_0)
c  in CNF:
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_2
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_1
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_0
c  in DIMACS:
-16274  16275 -16276 -672 -16277 0
-16274  16275 -16276 -672 -16278 0
-16274  16275 -16276 -672 -16279 0

c  0+1 --> 1
c    (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧  p_672) -> (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0)
c  in CNF:
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_2
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_1
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨  b^{42, 17}_0
c  in DIMACS:
 16274  16275  16276 -672 -16277 0
 16274  16275  16276 -672 -16278 0
 16274  16275  16276 -672  16279 0

c  1+1 --> 2
c    (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0 ∧  p_672) -> (-b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0)
c  in CNF:
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_2
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨  b^{42, 17}_1
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ -p_672 ∨ -b^{42, 17}_0
c  in DIMACS:
 16274  16275 -16276 -672 -16277 0
 16274  16275 -16276 -672  16278 0
 16274  16275 -16276 -672 -16279 0

c  2+1 --> break 
c    (-b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧  p_672) -> break
c  in CNF:
c     b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 16274 -16275  16276 -672 1162 0


c  2-1 --> 1
c    (-b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧ -p_672) -> (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0)
c  in CNF:
c     b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_2
c     b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_1
c     b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨  b^{42, 17}_0
c  in DIMACS:
 16274 -16275  16276  672 -16277 0
 16274 -16275  16276  672 -16278 0
 16274 -16275  16276  672  16279 0

c  1-1 --> 0
c    (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0 ∧ -p_672) -> (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧ -b^{42, 17}_0)
c  in CNF:
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_2
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_1
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_0
c  in DIMACS:
 16274  16275 -16276  672 -16277 0
 16274  16275 -16276  672 -16278 0
 16274  16275 -16276  672 -16279 0

c  0-1 --> -1
c    (-b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧ -p_672) -> ( b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0)
c  in CNF:
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨  b^{42, 17}_2
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_1
c     b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨  b^{42, 17}_0
c  in DIMACS:
 16274  16275  16276  672  16277 0
 16274  16275  16276  672 -16278 0
 16274  16275  16276  672  16279 0

c  -1-1 --> -2
c    ( b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧  b^{42, 16}_0 ∧ -p_672) -> ( b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0)
c  in CNF:
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨  b^{42, 17}_2
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨  b^{42, 17}_1
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨  p_672 ∨ -b^{42, 17}_0
c  in DIMACS:
-16274  16275 -16276  672  16277 0
-16274  16275 -16276  672  16278 0
-16274  16275 -16276  672 -16279 0

c  -2-1 --> break 
c    ( b^{42, 16}_2 ∧  b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨  b^{42, 16}_0 ∨  p_672 ∨ break
c  in DIMACS:
-16274 -16275  16276  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 16}_2 ∧ -b^{42, 16}_1 ∧ -b^{42, 16}_0 ∧ true) 
c  in CNF:
c    -b^{42, 16}_2 ∨  b^{42, 16}_1 ∨  b^{42, 16}_0 ∨ false 
c  in DIMACS:
-16274  16275  16276  0

c  3 does not represent an automaton state.
c    -(-b^{42, 16}_2 ∧  b^{42, 16}_1 ∧  b^{42, 16}_0 ∧ true) 
c  in CNF:
c     b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ false 
c  in DIMACS:
 16274 -16275 -16276  0
c  -3 does not represent an automaton state.
c    -( b^{42, 16}_2 ∧  b^{42, 16}_1 ∧  b^{42, 16}_0 ∧ true) 
c  in CNF:
c    -b^{42, 16}_2 ∨ -b^{42, 16}_1 ∨ -b^{42, 16}_0 ∨ false 
c  in DIMACS:
-16274 -16275 -16276  0

c i = 17
c  -2+1 --> -1
c    ( b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧  p_714) -> ( b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0)
c  in CNF:
c    -b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨  b^{42, 18}_2
c    -b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_1
c    -b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨  b^{42, 18}_0
c  in DIMACS:
-16277 -16278  16279 -714  16280 0
-16277 -16278  16279 -714 -16281 0
-16277 -16278  16279 -714  16282 0

c  -1+1 --> 0
c    ( b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0 ∧  p_714) -> (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧ -b^{42, 18}_0)
c  in CNF:
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_2
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_1
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_0
c  in DIMACS:
-16277  16278 -16279 -714 -16280 0
-16277  16278 -16279 -714 -16281 0
-16277  16278 -16279 -714 -16282 0

c  0+1 --> 1
c    (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧  p_714) -> (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0)
c  in CNF:
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_2
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_1
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨  b^{42, 18}_0
c  in DIMACS:
 16277  16278  16279 -714 -16280 0
 16277  16278  16279 -714 -16281 0
 16277  16278  16279 -714  16282 0

c  1+1 --> 2
c    (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0 ∧  p_714) -> (-b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0)
c  in CNF:
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_2
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨  b^{42, 18}_1
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ -p_714 ∨ -b^{42, 18}_0
c  in DIMACS:
 16277  16278 -16279 -714 -16280 0
 16277  16278 -16279 -714  16281 0
 16277  16278 -16279 -714 -16282 0

c  2+1 --> break 
c    (-b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧  p_714) -> break
c  in CNF:
c     b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 16277 -16278  16279 -714 1162 0


c  2-1 --> 1
c    (-b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧ -p_714) -> (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0)
c  in CNF:
c     b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_2
c     b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_1
c     b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨  b^{42, 18}_0
c  in DIMACS:
 16277 -16278  16279  714 -16280 0
 16277 -16278  16279  714 -16281 0
 16277 -16278  16279  714  16282 0

c  1-1 --> 0
c    (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0 ∧ -p_714) -> (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧ -b^{42, 18}_0)
c  in CNF:
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_2
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_1
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_0
c  in DIMACS:
 16277  16278 -16279  714 -16280 0
 16277  16278 -16279  714 -16281 0
 16277  16278 -16279  714 -16282 0

c  0-1 --> -1
c    (-b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧ -p_714) -> ( b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0)
c  in CNF:
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨  b^{42, 18}_2
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_1
c     b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨  b^{42, 18}_0
c  in DIMACS:
 16277  16278  16279  714  16280 0
 16277  16278  16279  714 -16281 0
 16277  16278  16279  714  16282 0

c  -1-1 --> -2
c    ( b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧  b^{42, 17}_0 ∧ -p_714) -> ( b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0)
c  in CNF:
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨  b^{42, 18}_2
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨  b^{42, 18}_1
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨  p_714 ∨ -b^{42, 18}_0
c  in DIMACS:
-16277  16278 -16279  714  16280 0
-16277  16278 -16279  714  16281 0
-16277  16278 -16279  714 -16282 0

c  -2-1 --> break 
c    ( b^{42, 17}_2 ∧  b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨  b^{42, 17}_0 ∨  p_714 ∨ break
c  in DIMACS:
-16277 -16278  16279  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 17}_2 ∧ -b^{42, 17}_1 ∧ -b^{42, 17}_0 ∧ true) 
c  in CNF:
c    -b^{42, 17}_2 ∨  b^{42, 17}_1 ∨  b^{42, 17}_0 ∨ false 
c  in DIMACS:
-16277  16278  16279  0

c  3 does not represent an automaton state.
c    -(-b^{42, 17}_2 ∧  b^{42, 17}_1 ∧  b^{42, 17}_0 ∧ true) 
c  in CNF:
c     b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ false 
c  in DIMACS:
 16277 -16278 -16279  0
c  -3 does not represent an automaton state.
c    -( b^{42, 17}_2 ∧  b^{42, 17}_1 ∧  b^{42, 17}_0 ∧ true) 
c  in CNF:
c    -b^{42, 17}_2 ∨ -b^{42, 17}_1 ∨ -b^{42, 17}_0 ∨ false 
c  in DIMACS:
-16277 -16278 -16279  0

c i = 18
c  -2+1 --> -1
c    ( b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧  p_756) -> ( b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0)
c  in CNF:
c    -b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨  b^{42, 19}_2
c    -b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_1
c    -b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨  b^{42, 19}_0
c  in DIMACS:
-16280 -16281  16282 -756  16283 0
-16280 -16281  16282 -756 -16284 0
-16280 -16281  16282 -756  16285 0

c  -1+1 --> 0
c    ( b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0 ∧  p_756) -> (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧ -b^{42, 19}_0)
c  in CNF:
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_2
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_1
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_0
c  in DIMACS:
-16280  16281 -16282 -756 -16283 0
-16280  16281 -16282 -756 -16284 0
-16280  16281 -16282 -756 -16285 0

c  0+1 --> 1
c    (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧  p_756) -> (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0)
c  in CNF:
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_2
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_1
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨  b^{42, 19}_0
c  in DIMACS:
 16280  16281  16282 -756 -16283 0
 16280  16281  16282 -756 -16284 0
 16280  16281  16282 -756  16285 0

c  1+1 --> 2
c    (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0 ∧  p_756) -> (-b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0)
c  in CNF:
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_2
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨  b^{42, 19}_1
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ -p_756 ∨ -b^{42, 19}_0
c  in DIMACS:
 16280  16281 -16282 -756 -16283 0
 16280  16281 -16282 -756  16284 0
 16280  16281 -16282 -756 -16285 0

c  2+1 --> break 
c    (-b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧  p_756) -> break
c  in CNF:
c     b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 16280 -16281  16282 -756 1162 0


c  2-1 --> 1
c    (-b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧ -p_756) -> (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0)
c  in CNF:
c     b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_2
c     b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_1
c     b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨  b^{42, 19}_0
c  in DIMACS:
 16280 -16281  16282  756 -16283 0
 16280 -16281  16282  756 -16284 0
 16280 -16281  16282  756  16285 0

c  1-1 --> 0
c    (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0 ∧ -p_756) -> (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧ -b^{42, 19}_0)
c  in CNF:
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_2
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_1
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_0
c  in DIMACS:
 16280  16281 -16282  756 -16283 0
 16280  16281 -16282  756 -16284 0
 16280  16281 -16282  756 -16285 0

c  0-1 --> -1
c    (-b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧ -p_756) -> ( b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0)
c  in CNF:
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨  b^{42, 19}_2
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_1
c     b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨  b^{42, 19}_0
c  in DIMACS:
 16280  16281  16282  756  16283 0
 16280  16281  16282  756 -16284 0
 16280  16281  16282  756  16285 0

c  -1-1 --> -2
c    ( b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧  b^{42, 18}_0 ∧ -p_756) -> ( b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0)
c  in CNF:
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨  b^{42, 19}_2
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨  b^{42, 19}_1
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨  p_756 ∨ -b^{42, 19}_0
c  in DIMACS:
-16280  16281 -16282  756  16283 0
-16280  16281 -16282  756  16284 0
-16280  16281 -16282  756 -16285 0

c  -2-1 --> break 
c    ( b^{42, 18}_2 ∧  b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨  b^{42, 18}_0 ∨  p_756 ∨ break
c  in DIMACS:
-16280 -16281  16282  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 18}_2 ∧ -b^{42, 18}_1 ∧ -b^{42, 18}_0 ∧ true) 
c  in CNF:
c    -b^{42, 18}_2 ∨  b^{42, 18}_1 ∨  b^{42, 18}_0 ∨ false 
c  in DIMACS:
-16280  16281  16282  0

c  3 does not represent an automaton state.
c    -(-b^{42, 18}_2 ∧  b^{42, 18}_1 ∧  b^{42, 18}_0 ∧ true) 
c  in CNF:
c     b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ false 
c  in DIMACS:
 16280 -16281 -16282  0
c  -3 does not represent an automaton state.
c    -( b^{42, 18}_2 ∧  b^{42, 18}_1 ∧  b^{42, 18}_0 ∧ true) 
c  in CNF:
c    -b^{42, 18}_2 ∨ -b^{42, 18}_1 ∨ -b^{42, 18}_0 ∨ false 
c  in DIMACS:
-16280 -16281 -16282  0

c i = 19
c  -2+1 --> -1
c    ( b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧  p_798) -> ( b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0)
c  in CNF:
c    -b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨  b^{42, 20}_2
c    -b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_1
c    -b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨  b^{42, 20}_0
c  in DIMACS:
-16283 -16284  16285 -798  16286 0
-16283 -16284  16285 -798 -16287 0
-16283 -16284  16285 -798  16288 0

c  -1+1 --> 0
c    ( b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0 ∧  p_798) -> (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧ -b^{42, 20}_0)
c  in CNF:
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_2
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_1
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_0
c  in DIMACS:
-16283  16284 -16285 -798 -16286 0
-16283  16284 -16285 -798 -16287 0
-16283  16284 -16285 -798 -16288 0

c  0+1 --> 1
c    (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧  p_798) -> (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0)
c  in CNF:
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_2
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_1
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨  b^{42, 20}_0
c  in DIMACS:
 16283  16284  16285 -798 -16286 0
 16283  16284  16285 -798 -16287 0
 16283  16284  16285 -798  16288 0

c  1+1 --> 2
c    (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0 ∧  p_798) -> (-b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0)
c  in CNF:
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_2
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨  b^{42, 20}_1
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ -p_798 ∨ -b^{42, 20}_0
c  in DIMACS:
 16283  16284 -16285 -798 -16286 0
 16283  16284 -16285 -798  16287 0
 16283  16284 -16285 -798 -16288 0

c  2+1 --> break 
c    (-b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧  p_798) -> break
c  in CNF:
c     b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 16283 -16284  16285 -798 1162 0


c  2-1 --> 1
c    (-b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧ -p_798) -> (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0)
c  in CNF:
c     b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_2
c     b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_1
c     b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨  b^{42, 20}_0
c  in DIMACS:
 16283 -16284  16285  798 -16286 0
 16283 -16284  16285  798 -16287 0
 16283 -16284  16285  798  16288 0

c  1-1 --> 0
c    (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0 ∧ -p_798) -> (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧ -b^{42, 20}_0)
c  in CNF:
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_2
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_1
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_0
c  in DIMACS:
 16283  16284 -16285  798 -16286 0
 16283  16284 -16285  798 -16287 0
 16283  16284 -16285  798 -16288 0

c  0-1 --> -1
c    (-b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧ -p_798) -> ( b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0)
c  in CNF:
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨  b^{42, 20}_2
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_1
c     b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨  b^{42, 20}_0
c  in DIMACS:
 16283  16284  16285  798  16286 0
 16283  16284  16285  798 -16287 0
 16283  16284  16285  798  16288 0

c  -1-1 --> -2
c    ( b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧  b^{42, 19}_0 ∧ -p_798) -> ( b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0)
c  in CNF:
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨  b^{42, 20}_2
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨  b^{42, 20}_1
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨  p_798 ∨ -b^{42, 20}_0
c  in DIMACS:
-16283  16284 -16285  798  16286 0
-16283  16284 -16285  798  16287 0
-16283  16284 -16285  798 -16288 0

c  -2-1 --> break 
c    ( b^{42, 19}_2 ∧  b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨  b^{42, 19}_0 ∨  p_798 ∨ break
c  in DIMACS:
-16283 -16284  16285  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 19}_2 ∧ -b^{42, 19}_1 ∧ -b^{42, 19}_0 ∧ true) 
c  in CNF:
c    -b^{42, 19}_2 ∨  b^{42, 19}_1 ∨  b^{42, 19}_0 ∨ false 
c  in DIMACS:
-16283  16284  16285  0

c  3 does not represent an automaton state.
c    -(-b^{42, 19}_2 ∧  b^{42, 19}_1 ∧  b^{42, 19}_0 ∧ true) 
c  in CNF:
c     b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ false 
c  in DIMACS:
 16283 -16284 -16285  0
c  -3 does not represent an automaton state.
c    -( b^{42, 19}_2 ∧  b^{42, 19}_1 ∧  b^{42, 19}_0 ∧ true) 
c  in CNF:
c    -b^{42, 19}_2 ∨ -b^{42, 19}_1 ∨ -b^{42, 19}_0 ∨ false 
c  in DIMACS:
-16283 -16284 -16285  0

c i = 20
c  -2+1 --> -1
c    ( b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧  p_840) -> ( b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0)
c  in CNF:
c    -b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨  b^{42, 21}_2
c    -b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_1
c    -b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨  b^{42, 21}_0
c  in DIMACS:
-16286 -16287  16288 -840  16289 0
-16286 -16287  16288 -840 -16290 0
-16286 -16287  16288 -840  16291 0

c  -1+1 --> 0
c    ( b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0 ∧  p_840) -> (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧ -b^{42, 21}_0)
c  in CNF:
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_2
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_1
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_0
c  in DIMACS:
-16286  16287 -16288 -840 -16289 0
-16286  16287 -16288 -840 -16290 0
-16286  16287 -16288 -840 -16291 0

c  0+1 --> 1
c    (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧  p_840) -> (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0)
c  in CNF:
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_2
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_1
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨  b^{42, 21}_0
c  in DIMACS:
 16286  16287  16288 -840 -16289 0
 16286  16287  16288 -840 -16290 0
 16286  16287  16288 -840  16291 0

c  1+1 --> 2
c    (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0 ∧  p_840) -> (-b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0)
c  in CNF:
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_2
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨  b^{42, 21}_1
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ -p_840 ∨ -b^{42, 21}_0
c  in DIMACS:
 16286  16287 -16288 -840 -16289 0
 16286  16287 -16288 -840  16290 0
 16286  16287 -16288 -840 -16291 0

c  2+1 --> break 
c    (-b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧  p_840) -> break
c  in CNF:
c     b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 16286 -16287  16288 -840 1162 0


c  2-1 --> 1
c    (-b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧ -p_840) -> (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0)
c  in CNF:
c     b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_2
c     b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_1
c     b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨  b^{42, 21}_0
c  in DIMACS:
 16286 -16287  16288  840 -16289 0
 16286 -16287  16288  840 -16290 0
 16286 -16287  16288  840  16291 0

c  1-1 --> 0
c    (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0 ∧ -p_840) -> (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧ -b^{42, 21}_0)
c  in CNF:
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_2
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_1
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_0
c  in DIMACS:
 16286  16287 -16288  840 -16289 0
 16286  16287 -16288  840 -16290 0
 16286  16287 -16288  840 -16291 0

c  0-1 --> -1
c    (-b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧ -p_840) -> ( b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0)
c  in CNF:
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨  b^{42, 21}_2
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_1
c     b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨  b^{42, 21}_0
c  in DIMACS:
 16286  16287  16288  840  16289 0
 16286  16287  16288  840 -16290 0
 16286  16287  16288  840  16291 0

c  -1-1 --> -2
c    ( b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧  b^{42, 20}_0 ∧ -p_840) -> ( b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0)
c  in CNF:
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨  b^{42, 21}_2
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨  b^{42, 21}_1
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨  p_840 ∨ -b^{42, 21}_0
c  in DIMACS:
-16286  16287 -16288  840  16289 0
-16286  16287 -16288  840  16290 0
-16286  16287 -16288  840 -16291 0

c  -2-1 --> break 
c    ( b^{42, 20}_2 ∧  b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨  b^{42, 20}_0 ∨  p_840 ∨ break
c  in DIMACS:
-16286 -16287  16288  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 20}_2 ∧ -b^{42, 20}_1 ∧ -b^{42, 20}_0 ∧ true) 
c  in CNF:
c    -b^{42, 20}_2 ∨  b^{42, 20}_1 ∨  b^{42, 20}_0 ∨ false 
c  in DIMACS:
-16286  16287  16288  0

c  3 does not represent an automaton state.
c    -(-b^{42, 20}_2 ∧  b^{42, 20}_1 ∧  b^{42, 20}_0 ∧ true) 
c  in CNF:
c     b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ false 
c  in DIMACS:
 16286 -16287 -16288  0
c  -3 does not represent an automaton state.
c    -( b^{42, 20}_2 ∧  b^{42, 20}_1 ∧  b^{42, 20}_0 ∧ true) 
c  in CNF:
c    -b^{42, 20}_2 ∨ -b^{42, 20}_1 ∨ -b^{42, 20}_0 ∨ false 
c  in DIMACS:
-16286 -16287 -16288  0

c i = 21
c  -2+1 --> -1
c    ( b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧  p_882) -> ( b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0)
c  in CNF:
c    -b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨  b^{42, 22}_2
c    -b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_1
c    -b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨  b^{42, 22}_0
c  in DIMACS:
-16289 -16290  16291 -882  16292 0
-16289 -16290  16291 -882 -16293 0
-16289 -16290  16291 -882  16294 0

c  -1+1 --> 0
c    ( b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0 ∧  p_882) -> (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧ -b^{42, 22}_0)
c  in CNF:
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_2
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_1
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_0
c  in DIMACS:
-16289  16290 -16291 -882 -16292 0
-16289  16290 -16291 -882 -16293 0
-16289  16290 -16291 -882 -16294 0

c  0+1 --> 1
c    (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧  p_882) -> (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0)
c  in CNF:
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_2
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_1
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨  b^{42, 22}_0
c  in DIMACS:
 16289  16290  16291 -882 -16292 0
 16289  16290  16291 -882 -16293 0
 16289  16290  16291 -882  16294 0

c  1+1 --> 2
c    (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0 ∧  p_882) -> (-b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0)
c  in CNF:
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_2
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨  b^{42, 22}_1
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ -p_882 ∨ -b^{42, 22}_0
c  in DIMACS:
 16289  16290 -16291 -882 -16292 0
 16289  16290 -16291 -882  16293 0
 16289  16290 -16291 -882 -16294 0

c  2+1 --> break 
c    (-b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧  p_882) -> break
c  in CNF:
c     b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 16289 -16290  16291 -882 1162 0


c  2-1 --> 1
c    (-b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧ -p_882) -> (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0)
c  in CNF:
c     b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_2
c     b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_1
c     b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨  b^{42, 22}_0
c  in DIMACS:
 16289 -16290  16291  882 -16292 0
 16289 -16290  16291  882 -16293 0
 16289 -16290  16291  882  16294 0

c  1-1 --> 0
c    (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0 ∧ -p_882) -> (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧ -b^{42, 22}_0)
c  in CNF:
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_2
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_1
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_0
c  in DIMACS:
 16289  16290 -16291  882 -16292 0
 16289  16290 -16291  882 -16293 0
 16289  16290 -16291  882 -16294 0

c  0-1 --> -1
c    (-b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧ -p_882) -> ( b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0)
c  in CNF:
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨  b^{42, 22}_2
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_1
c     b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨  b^{42, 22}_0
c  in DIMACS:
 16289  16290  16291  882  16292 0
 16289  16290  16291  882 -16293 0
 16289  16290  16291  882  16294 0

c  -1-1 --> -2
c    ( b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧  b^{42, 21}_0 ∧ -p_882) -> ( b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0)
c  in CNF:
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨  b^{42, 22}_2
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨  b^{42, 22}_1
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨  p_882 ∨ -b^{42, 22}_0
c  in DIMACS:
-16289  16290 -16291  882  16292 0
-16289  16290 -16291  882  16293 0
-16289  16290 -16291  882 -16294 0

c  -2-1 --> break 
c    ( b^{42, 21}_2 ∧  b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨  b^{42, 21}_0 ∨  p_882 ∨ break
c  in DIMACS:
-16289 -16290  16291  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 21}_2 ∧ -b^{42, 21}_1 ∧ -b^{42, 21}_0 ∧ true) 
c  in CNF:
c    -b^{42, 21}_2 ∨  b^{42, 21}_1 ∨  b^{42, 21}_0 ∨ false 
c  in DIMACS:
-16289  16290  16291  0

c  3 does not represent an automaton state.
c    -(-b^{42, 21}_2 ∧  b^{42, 21}_1 ∧  b^{42, 21}_0 ∧ true) 
c  in CNF:
c     b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ false 
c  in DIMACS:
 16289 -16290 -16291  0
c  -3 does not represent an automaton state.
c    -( b^{42, 21}_2 ∧  b^{42, 21}_1 ∧  b^{42, 21}_0 ∧ true) 
c  in CNF:
c    -b^{42, 21}_2 ∨ -b^{42, 21}_1 ∨ -b^{42, 21}_0 ∨ false 
c  in DIMACS:
-16289 -16290 -16291  0

c i = 22
c  -2+1 --> -1
c    ( b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧  p_924) -> ( b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0)
c  in CNF:
c    -b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨  b^{42, 23}_2
c    -b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_1
c    -b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨  b^{42, 23}_0
c  in DIMACS:
-16292 -16293  16294 -924  16295 0
-16292 -16293  16294 -924 -16296 0
-16292 -16293  16294 -924  16297 0

c  -1+1 --> 0
c    ( b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0 ∧  p_924) -> (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧ -b^{42, 23}_0)
c  in CNF:
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_2
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_1
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_0
c  in DIMACS:
-16292  16293 -16294 -924 -16295 0
-16292  16293 -16294 -924 -16296 0
-16292  16293 -16294 -924 -16297 0

c  0+1 --> 1
c    (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧  p_924) -> (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0)
c  in CNF:
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_2
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_1
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨  b^{42, 23}_0
c  in DIMACS:
 16292  16293  16294 -924 -16295 0
 16292  16293  16294 -924 -16296 0
 16292  16293  16294 -924  16297 0

c  1+1 --> 2
c    (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0 ∧  p_924) -> (-b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0)
c  in CNF:
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_2
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨  b^{42, 23}_1
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ -p_924 ∨ -b^{42, 23}_0
c  in DIMACS:
 16292  16293 -16294 -924 -16295 0
 16292  16293 -16294 -924  16296 0
 16292  16293 -16294 -924 -16297 0

c  2+1 --> break 
c    (-b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧  p_924) -> break
c  in CNF:
c     b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 16292 -16293  16294 -924 1162 0


c  2-1 --> 1
c    (-b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧ -p_924) -> (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0)
c  in CNF:
c     b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_2
c     b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_1
c     b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨  b^{42, 23}_0
c  in DIMACS:
 16292 -16293  16294  924 -16295 0
 16292 -16293  16294  924 -16296 0
 16292 -16293  16294  924  16297 0

c  1-1 --> 0
c    (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0 ∧ -p_924) -> (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧ -b^{42, 23}_0)
c  in CNF:
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_2
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_1
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_0
c  in DIMACS:
 16292  16293 -16294  924 -16295 0
 16292  16293 -16294  924 -16296 0
 16292  16293 -16294  924 -16297 0

c  0-1 --> -1
c    (-b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧ -p_924) -> ( b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0)
c  in CNF:
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨  b^{42, 23}_2
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_1
c     b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨  b^{42, 23}_0
c  in DIMACS:
 16292  16293  16294  924  16295 0
 16292  16293  16294  924 -16296 0
 16292  16293  16294  924  16297 0

c  -1-1 --> -2
c    ( b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧  b^{42, 22}_0 ∧ -p_924) -> ( b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0)
c  in CNF:
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨  b^{42, 23}_2
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨  b^{42, 23}_1
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨  p_924 ∨ -b^{42, 23}_0
c  in DIMACS:
-16292  16293 -16294  924  16295 0
-16292  16293 -16294  924  16296 0
-16292  16293 -16294  924 -16297 0

c  -2-1 --> break 
c    ( b^{42, 22}_2 ∧  b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨  b^{42, 22}_0 ∨  p_924 ∨ break
c  in DIMACS:
-16292 -16293  16294  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 22}_2 ∧ -b^{42, 22}_1 ∧ -b^{42, 22}_0 ∧ true) 
c  in CNF:
c    -b^{42, 22}_2 ∨  b^{42, 22}_1 ∨  b^{42, 22}_0 ∨ false 
c  in DIMACS:
-16292  16293  16294  0

c  3 does not represent an automaton state.
c    -(-b^{42, 22}_2 ∧  b^{42, 22}_1 ∧  b^{42, 22}_0 ∧ true) 
c  in CNF:
c     b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ false 
c  in DIMACS:
 16292 -16293 -16294  0
c  -3 does not represent an automaton state.
c    -( b^{42, 22}_2 ∧  b^{42, 22}_1 ∧  b^{42, 22}_0 ∧ true) 
c  in CNF:
c    -b^{42, 22}_2 ∨ -b^{42, 22}_1 ∨ -b^{42, 22}_0 ∨ false 
c  in DIMACS:
-16292 -16293 -16294  0

c i = 23
c  -2+1 --> -1
c    ( b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧  p_966) -> ( b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0)
c  in CNF:
c    -b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨  b^{42, 24}_2
c    -b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_1
c    -b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨  b^{42, 24}_0
c  in DIMACS:
-16295 -16296  16297 -966  16298 0
-16295 -16296  16297 -966 -16299 0
-16295 -16296  16297 -966  16300 0

c  -1+1 --> 0
c    ( b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0 ∧  p_966) -> (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧ -b^{42, 24}_0)
c  in CNF:
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_2
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_1
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_0
c  in DIMACS:
-16295  16296 -16297 -966 -16298 0
-16295  16296 -16297 -966 -16299 0
-16295  16296 -16297 -966 -16300 0

c  0+1 --> 1
c    (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧  p_966) -> (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0)
c  in CNF:
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_2
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_1
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨  b^{42, 24}_0
c  in DIMACS:
 16295  16296  16297 -966 -16298 0
 16295  16296  16297 -966 -16299 0
 16295  16296  16297 -966  16300 0

c  1+1 --> 2
c    (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0 ∧  p_966) -> (-b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0)
c  in CNF:
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_2
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨  b^{42, 24}_1
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ -p_966 ∨ -b^{42, 24}_0
c  in DIMACS:
 16295  16296 -16297 -966 -16298 0
 16295  16296 -16297 -966  16299 0
 16295  16296 -16297 -966 -16300 0

c  2+1 --> break 
c    (-b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧  p_966) -> break
c  in CNF:
c     b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 16295 -16296  16297 -966 1162 0


c  2-1 --> 1
c    (-b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧ -p_966) -> (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0)
c  in CNF:
c     b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_2
c     b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_1
c     b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨  b^{42, 24}_0
c  in DIMACS:
 16295 -16296  16297  966 -16298 0
 16295 -16296  16297  966 -16299 0
 16295 -16296  16297  966  16300 0

c  1-1 --> 0
c    (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0 ∧ -p_966) -> (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧ -b^{42, 24}_0)
c  in CNF:
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_2
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_1
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_0
c  in DIMACS:
 16295  16296 -16297  966 -16298 0
 16295  16296 -16297  966 -16299 0
 16295  16296 -16297  966 -16300 0

c  0-1 --> -1
c    (-b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧ -p_966) -> ( b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0)
c  in CNF:
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨  b^{42, 24}_2
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_1
c     b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨  b^{42, 24}_0
c  in DIMACS:
 16295  16296  16297  966  16298 0
 16295  16296  16297  966 -16299 0
 16295  16296  16297  966  16300 0

c  -1-1 --> -2
c    ( b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧  b^{42, 23}_0 ∧ -p_966) -> ( b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0)
c  in CNF:
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨  b^{42, 24}_2
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨  b^{42, 24}_1
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨  p_966 ∨ -b^{42, 24}_0
c  in DIMACS:
-16295  16296 -16297  966  16298 0
-16295  16296 -16297  966  16299 0
-16295  16296 -16297  966 -16300 0

c  -2-1 --> break 
c    ( b^{42, 23}_2 ∧  b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨  b^{42, 23}_0 ∨  p_966 ∨ break
c  in DIMACS:
-16295 -16296  16297  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 23}_2 ∧ -b^{42, 23}_1 ∧ -b^{42, 23}_0 ∧ true) 
c  in CNF:
c    -b^{42, 23}_2 ∨  b^{42, 23}_1 ∨  b^{42, 23}_0 ∨ false 
c  in DIMACS:
-16295  16296  16297  0

c  3 does not represent an automaton state.
c    -(-b^{42, 23}_2 ∧  b^{42, 23}_1 ∧  b^{42, 23}_0 ∧ true) 
c  in CNF:
c     b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ false 
c  in DIMACS:
 16295 -16296 -16297  0
c  -3 does not represent an automaton state.
c    -( b^{42, 23}_2 ∧  b^{42, 23}_1 ∧  b^{42, 23}_0 ∧ true) 
c  in CNF:
c    -b^{42, 23}_2 ∨ -b^{42, 23}_1 ∨ -b^{42, 23}_0 ∨ false 
c  in DIMACS:
-16295 -16296 -16297  0

c i = 24
c  -2+1 --> -1
c    ( b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧  p_1008) -> ( b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0)
c  in CNF:
c    -b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨  b^{42, 25}_2
c    -b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_1
c    -b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨  b^{42, 25}_0
c  in DIMACS:
-16298 -16299  16300 -1008  16301 0
-16298 -16299  16300 -1008 -16302 0
-16298 -16299  16300 -1008  16303 0

c  -1+1 --> 0
c    ( b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0 ∧  p_1008) -> (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧ -b^{42, 25}_0)
c  in CNF:
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_2
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_1
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_0
c  in DIMACS:
-16298  16299 -16300 -1008 -16301 0
-16298  16299 -16300 -1008 -16302 0
-16298  16299 -16300 -1008 -16303 0

c  0+1 --> 1
c    (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧  p_1008) -> (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0)
c  in CNF:
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_2
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_1
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨  b^{42, 25}_0
c  in DIMACS:
 16298  16299  16300 -1008 -16301 0
 16298  16299  16300 -1008 -16302 0
 16298  16299  16300 -1008  16303 0

c  1+1 --> 2
c    (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0 ∧  p_1008) -> (-b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0)
c  in CNF:
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_2
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨  b^{42, 25}_1
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ -p_1008 ∨ -b^{42, 25}_0
c  in DIMACS:
 16298  16299 -16300 -1008 -16301 0
 16298  16299 -16300 -1008  16302 0
 16298  16299 -16300 -1008 -16303 0

c  2+1 --> break 
c    (-b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 16298 -16299  16300 -1008 1162 0


c  2-1 --> 1
c    (-b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧ -p_1008) -> (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0)
c  in CNF:
c     b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_2
c     b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_1
c     b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨  b^{42, 25}_0
c  in DIMACS:
 16298 -16299  16300  1008 -16301 0
 16298 -16299  16300  1008 -16302 0
 16298 -16299  16300  1008  16303 0

c  1-1 --> 0
c    (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0 ∧ -p_1008) -> (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧ -b^{42, 25}_0)
c  in CNF:
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_2
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_1
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_0
c  in DIMACS:
 16298  16299 -16300  1008 -16301 0
 16298  16299 -16300  1008 -16302 0
 16298  16299 -16300  1008 -16303 0

c  0-1 --> -1
c    (-b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧ -p_1008) -> ( b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0)
c  in CNF:
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨  b^{42, 25}_2
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_1
c     b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨  b^{42, 25}_0
c  in DIMACS:
 16298  16299  16300  1008  16301 0
 16298  16299  16300  1008 -16302 0
 16298  16299  16300  1008  16303 0

c  -1-1 --> -2
c    ( b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧  b^{42, 24}_0 ∧ -p_1008) -> ( b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0)
c  in CNF:
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨  b^{42, 25}_2
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨  b^{42, 25}_1
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨  p_1008 ∨ -b^{42, 25}_0
c  in DIMACS:
-16298  16299 -16300  1008  16301 0
-16298  16299 -16300  1008  16302 0
-16298  16299 -16300  1008 -16303 0

c  -2-1 --> break 
c    ( b^{42, 24}_2 ∧  b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨  b^{42, 24}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-16298 -16299  16300  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 24}_2 ∧ -b^{42, 24}_1 ∧ -b^{42, 24}_0 ∧ true) 
c  in CNF:
c    -b^{42, 24}_2 ∨  b^{42, 24}_1 ∨  b^{42, 24}_0 ∨ false 
c  in DIMACS:
-16298  16299  16300  0

c  3 does not represent an automaton state.
c    -(-b^{42, 24}_2 ∧  b^{42, 24}_1 ∧  b^{42, 24}_0 ∧ true) 
c  in CNF:
c     b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ false 
c  in DIMACS:
 16298 -16299 -16300  0
c  -3 does not represent an automaton state.
c    -( b^{42, 24}_2 ∧  b^{42, 24}_1 ∧  b^{42, 24}_0 ∧ true) 
c  in CNF:
c    -b^{42, 24}_2 ∨ -b^{42, 24}_1 ∨ -b^{42, 24}_0 ∨ false 
c  in DIMACS:
-16298 -16299 -16300  0

c i = 25
c  -2+1 --> -1
c    ( b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧  p_1050) -> ( b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0)
c  in CNF:
c    -b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨  b^{42, 26}_2
c    -b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_1
c    -b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨  b^{42, 26}_0
c  in DIMACS:
-16301 -16302  16303 -1050  16304 0
-16301 -16302  16303 -1050 -16305 0
-16301 -16302  16303 -1050  16306 0

c  -1+1 --> 0
c    ( b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0 ∧  p_1050) -> (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧ -b^{42, 26}_0)
c  in CNF:
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_2
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_1
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_0
c  in DIMACS:
-16301  16302 -16303 -1050 -16304 0
-16301  16302 -16303 -1050 -16305 0
-16301  16302 -16303 -1050 -16306 0

c  0+1 --> 1
c    (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧  p_1050) -> (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0)
c  in CNF:
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_2
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_1
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨  b^{42, 26}_0
c  in DIMACS:
 16301  16302  16303 -1050 -16304 0
 16301  16302  16303 -1050 -16305 0
 16301  16302  16303 -1050  16306 0

c  1+1 --> 2
c    (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0 ∧  p_1050) -> (-b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0)
c  in CNF:
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_2
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨  b^{42, 26}_1
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ -p_1050 ∨ -b^{42, 26}_0
c  in DIMACS:
 16301  16302 -16303 -1050 -16304 0
 16301  16302 -16303 -1050  16305 0
 16301  16302 -16303 -1050 -16306 0

c  2+1 --> break 
c    (-b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 16301 -16302  16303 -1050 1162 0


c  2-1 --> 1
c    (-b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧ -p_1050) -> (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0)
c  in CNF:
c     b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_2
c     b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_1
c     b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨  b^{42, 26}_0
c  in DIMACS:
 16301 -16302  16303  1050 -16304 0
 16301 -16302  16303  1050 -16305 0
 16301 -16302  16303  1050  16306 0

c  1-1 --> 0
c    (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0 ∧ -p_1050) -> (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧ -b^{42, 26}_0)
c  in CNF:
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_2
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_1
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_0
c  in DIMACS:
 16301  16302 -16303  1050 -16304 0
 16301  16302 -16303  1050 -16305 0
 16301  16302 -16303  1050 -16306 0

c  0-1 --> -1
c    (-b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧ -p_1050) -> ( b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0)
c  in CNF:
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨  b^{42, 26}_2
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_1
c     b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨  b^{42, 26}_0
c  in DIMACS:
 16301  16302  16303  1050  16304 0
 16301  16302  16303  1050 -16305 0
 16301  16302  16303  1050  16306 0

c  -1-1 --> -2
c    ( b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧  b^{42, 25}_0 ∧ -p_1050) -> ( b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0)
c  in CNF:
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨  b^{42, 26}_2
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨  b^{42, 26}_1
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨  p_1050 ∨ -b^{42, 26}_0
c  in DIMACS:
-16301  16302 -16303  1050  16304 0
-16301  16302 -16303  1050  16305 0
-16301  16302 -16303  1050 -16306 0

c  -2-1 --> break 
c    ( b^{42, 25}_2 ∧  b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨  b^{42, 25}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-16301 -16302  16303  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 25}_2 ∧ -b^{42, 25}_1 ∧ -b^{42, 25}_0 ∧ true) 
c  in CNF:
c    -b^{42, 25}_2 ∨  b^{42, 25}_1 ∨  b^{42, 25}_0 ∨ false 
c  in DIMACS:
-16301  16302  16303  0

c  3 does not represent an automaton state.
c    -(-b^{42, 25}_2 ∧  b^{42, 25}_1 ∧  b^{42, 25}_0 ∧ true) 
c  in CNF:
c     b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ false 
c  in DIMACS:
 16301 -16302 -16303  0
c  -3 does not represent an automaton state.
c    -( b^{42, 25}_2 ∧  b^{42, 25}_1 ∧  b^{42, 25}_0 ∧ true) 
c  in CNF:
c    -b^{42, 25}_2 ∨ -b^{42, 25}_1 ∨ -b^{42, 25}_0 ∨ false 
c  in DIMACS:
-16301 -16302 -16303  0

c i = 26
c  -2+1 --> -1
c    ( b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧  p_1092) -> ( b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0)
c  in CNF:
c    -b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨  b^{42, 27}_2
c    -b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_1
c    -b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨  b^{42, 27}_0
c  in DIMACS:
-16304 -16305  16306 -1092  16307 0
-16304 -16305  16306 -1092 -16308 0
-16304 -16305  16306 -1092  16309 0

c  -1+1 --> 0
c    ( b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0 ∧  p_1092) -> (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧ -b^{42, 27}_0)
c  in CNF:
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_2
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_1
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_0
c  in DIMACS:
-16304  16305 -16306 -1092 -16307 0
-16304  16305 -16306 -1092 -16308 0
-16304  16305 -16306 -1092 -16309 0

c  0+1 --> 1
c    (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧  p_1092) -> (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0)
c  in CNF:
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_2
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_1
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨  b^{42, 27}_0
c  in DIMACS:
 16304  16305  16306 -1092 -16307 0
 16304  16305  16306 -1092 -16308 0
 16304  16305  16306 -1092  16309 0

c  1+1 --> 2
c    (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0 ∧  p_1092) -> (-b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0)
c  in CNF:
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_2
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨  b^{42, 27}_1
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ -p_1092 ∨ -b^{42, 27}_0
c  in DIMACS:
 16304  16305 -16306 -1092 -16307 0
 16304  16305 -16306 -1092  16308 0
 16304  16305 -16306 -1092 -16309 0

c  2+1 --> break 
c    (-b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 16304 -16305  16306 -1092 1162 0


c  2-1 --> 1
c    (-b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧ -p_1092) -> (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0)
c  in CNF:
c     b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_2
c     b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_1
c     b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨  b^{42, 27}_0
c  in DIMACS:
 16304 -16305  16306  1092 -16307 0
 16304 -16305  16306  1092 -16308 0
 16304 -16305  16306  1092  16309 0

c  1-1 --> 0
c    (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0 ∧ -p_1092) -> (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧ -b^{42, 27}_0)
c  in CNF:
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_2
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_1
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_0
c  in DIMACS:
 16304  16305 -16306  1092 -16307 0
 16304  16305 -16306  1092 -16308 0
 16304  16305 -16306  1092 -16309 0

c  0-1 --> -1
c    (-b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧ -p_1092) -> ( b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0)
c  in CNF:
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨  b^{42, 27}_2
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_1
c     b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨  b^{42, 27}_0
c  in DIMACS:
 16304  16305  16306  1092  16307 0
 16304  16305  16306  1092 -16308 0
 16304  16305  16306  1092  16309 0

c  -1-1 --> -2
c    ( b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧  b^{42, 26}_0 ∧ -p_1092) -> ( b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0)
c  in CNF:
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨  b^{42, 27}_2
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨  b^{42, 27}_1
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨  p_1092 ∨ -b^{42, 27}_0
c  in DIMACS:
-16304  16305 -16306  1092  16307 0
-16304  16305 -16306  1092  16308 0
-16304  16305 -16306  1092 -16309 0

c  -2-1 --> break 
c    ( b^{42, 26}_2 ∧  b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨  b^{42, 26}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-16304 -16305  16306  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 26}_2 ∧ -b^{42, 26}_1 ∧ -b^{42, 26}_0 ∧ true) 
c  in CNF:
c    -b^{42, 26}_2 ∨  b^{42, 26}_1 ∨  b^{42, 26}_0 ∨ false 
c  in DIMACS:
-16304  16305  16306  0

c  3 does not represent an automaton state.
c    -(-b^{42, 26}_2 ∧  b^{42, 26}_1 ∧  b^{42, 26}_0 ∧ true) 
c  in CNF:
c     b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ false 
c  in DIMACS:
 16304 -16305 -16306  0
c  -3 does not represent an automaton state.
c    -( b^{42, 26}_2 ∧  b^{42, 26}_1 ∧  b^{42, 26}_0 ∧ true) 
c  in CNF:
c    -b^{42, 26}_2 ∨ -b^{42, 26}_1 ∨ -b^{42, 26}_0 ∨ false 
c  in DIMACS:
-16304 -16305 -16306  0

c i = 27
c  -2+1 --> -1
c    ( b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧  p_1134) -> ( b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧  b^{42, 28}_0)
c  in CNF:
c    -b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨  b^{42, 28}_2
c    -b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_1
c    -b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨  b^{42, 28}_0
c  in DIMACS:
-16307 -16308  16309 -1134  16310 0
-16307 -16308  16309 -1134 -16311 0
-16307 -16308  16309 -1134  16312 0

c  -1+1 --> 0
c    ( b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0 ∧  p_1134) -> (-b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧ -b^{42, 28}_0)
c  in CNF:
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_2
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_1
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_0
c  in DIMACS:
-16307  16308 -16309 -1134 -16310 0
-16307  16308 -16309 -1134 -16311 0
-16307  16308 -16309 -1134 -16312 0

c  0+1 --> 1
c    (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧  p_1134) -> (-b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧  b^{42, 28}_0)
c  in CNF:
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_2
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_1
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨  b^{42, 28}_0
c  in DIMACS:
 16307  16308  16309 -1134 -16310 0
 16307  16308  16309 -1134 -16311 0
 16307  16308  16309 -1134  16312 0

c  1+1 --> 2
c    (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0 ∧  p_1134) -> (-b^{42, 28}_2 ∧  b^{42, 28}_1 ∧ -b^{42, 28}_0)
c  in CNF:
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_2
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨  b^{42, 28}_1
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ -p_1134 ∨ -b^{42, 28}_0
c  in DIMACS:
 16307  16308 -16309 -1134 -16310 0
 16307  16308 -16309 -1134  16311 0
 16307  16308 -16309 -1134 -16312 0

c  2+1 --> break 
c    (-b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 16307 -16308  16309 -1134 1162 0


c  2-1 --> 1
c    (-b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧ -p_1134) -> (-b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧  b^{42, 28}_0)
c  in CNF:
c     b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_2
c     b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_1
c     b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨  b^{42, 28}_0
c  in DIMACS:
 16307 -16308  16309  1134 -16310 0
 16307 -16308  16309  1134 -16311 0
 16307 -16308  16309  1134  16312 0

c  1-1 --> 0
c    (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0 ∧ -p_1134) -> (-b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧ -b^{42, 28}_0)
c  in CNF:
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_2
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_1
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_0
c  in DIMACS:
 16307  16308 -16309  1134 -16310 0
 16307  16308 -16309  1134 -16311 0
 16307  16308 -16309  1134 -16312 0

c  0-1 --> -1
c    (-b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧ -p_1134) -> ( b^{42, 28}_2 ∧ -b^{42, 28}_1 ∧  b^{42, 28}_0)
c  in CNF:
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨  b^{42, 28}_2
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_1
c     b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨  b^{42, 28}_0
c  in DIMACS:
 16307  16308  16309  1134  16310 0
 16307  16308  16309  1134 -16311 0
 16307  16308  16309  1134  16312 0

c  -1-1 --> -2
c    ( b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧  b^{42, 27}_0 ∧ -p_1134) -> ( b^{42, 28}_2 ∧  b^{42, 28}_1 ∧ -b^{42, 28}_0)
c  in CNF:
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨  b^{42, 28}_2
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨  b^{42, 28}_1
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨  p_1134 ∨ -b^{42, 28}_0
c  in DIMACS:
-16307  16308 -16309  1134  16310 0
-16307  16308 -16309  1134  16311 0
-16307  16308 -16309  1134 -16312 0

c  -2-1 --> break 
c    ( b^{42, 27}_2 ∧  b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨  b^{42, 27}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-16307 -16308  16309  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{42, 27}_2 ∧ -b^{42, 27}_1 ∧ -b^{42, 27}_0 ∧ true) 
c  in CNF:
c    -b^{42, 27}_2 ∨  b^{42, 27}_1 ∨  b^{42, 27}_0 ∨ false 
c  in DIMACS:
-16307  16308  16309  0

c  3 does not represent an automaton state.
c    -(-b^{42, 27}_2 ∧  b^{42, 27}_1 ∧  b^{42, 27}_0 ∧ true) 
c  in CNF:
c     b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ false 
c  in DIMACS:
 16307 -16308 -16309  0
c  -3 does not represent an automaton state.
c    -( b^{42, 27}_2 ∧  b^{42, 27}_1 ∧  b^{42, 27}_0 ∧ true) 
c  in CNF:
c    -b^{42, 27}_2 ∨ -b^{42, 27}_1 ∨ -b^{42, 27}_0 ∨ false 
c  in DIMACS:
-16307 -16308 -16309  0

c INIT for k = 43
c    -b^{43, 1}_2
c    -b^{43, 1}_1
c    -b^{43, 1}_0
c  in DIMACS:
-16313 0
-16314 0
-16315 0

c Transitions for k = 43
c i = 1
c  -2+1 --> -1
c    ( b^{43, 1}_2 ∧  b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧  p_43) -> ( b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0)
c  in CNF:
c    -b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨  b^{43, 2}_2
c    -b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_1
c    -b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨  b^{43, 2}_0
c  in DIMACS:
-16313 -16314  16315 -43  16316 0
-16313 -16314  16315 -43 -16317 0
-16313 -16314  16315 -43  16318 0

c  -1+1 --> 0
c    ( b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧  b^{43, 1}_0 ∧  p_43) -> (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧ -b^{43, 2}_0)
c  in CNF:
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_2
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_1
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_0
c  in DIMACS:
-16313  16314 -16315 -43 -16316 0
-16313  16314 -16315 -43 -16317 0
-16313  16314 -16315 -43 -16318 0

c  0+1 --> 1
c    (-b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧  p_43) -> (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0)
c  in CNF:
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_2
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_1
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨  b^{43, 2}_0
c  in DIMACS:
 16313  16314  16315 -43 -16316 0
 16313  16314  16315 -43 -16317 0
 16313  16314  16315 -43  16318 0

c  1+1 --> 2
c    (-b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧  b^{43, 1}_0 ∧  p_43) -> (-b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0)
c  in CNF:
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_2
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨  b^{43, 2}_1
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ -p_43 ∨ -b^{43, 2}_0
c  in DIMACS:
 16313  16314 -16315 -43 -16316 0
 16313  16314 -16315 -43  16317 0
 16313  16314 -16315 -43 -16318 0

c  2+1 --> break 
c    (-b^{43, 1}_2 ∧  b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧  p_43) -> break
c  in CNF:
c     b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ -p_43 ∨ break
c  in DIMACS:
 16313 -16314  16315 -43 1162 0


c  2-1 --> 1
c    (-b^{43, 1}_2 ∧  b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧ -p_43) -> (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0)
c  in CNF:
c     b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_2
c     b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_1
c     b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨  b^{43, 2}_0
c  in DIMACS:
 16313 -16314  16315  43 -16316 0
 16313 -16314  16315  43 -16317 0
 16313 -16314  16315  43  16318 0

c  1-1 --> 0
c    (-b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧  b^{43, 1}_0 ∧ -p_43) -> (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧ -b^{43, 2}_0)
c  in CNF:
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_2
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_1
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_0
c  in DIMACS:
 16313  16314 -16315  43 -16316 0
 16313  16314 -16315  43 -16317 0
 16313  16314 -16315  43 -16318 0

c  0-1 --> -1
c    (-b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧ -p_43) -> ( b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0)
c  in CNF:
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨  b^{43, 2}_2
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_1
c     b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨  b^{43, 2}_0
c  in DIMACS:
 16313  16314  16315  43  16316 0
 16313  16314  16315  43 -16317 0
 16313  16314  16315  43  16318 0

c  -1-1 --> -2
c    ( b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧  b^{43, 1}_0 ∧ -p_43) -> ( b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0)
c  in CNF:
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨  b^{43, 2}_2
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨  b^{43, 2}_1
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨  p_43 ∨ -b^{43, 2}_0
c  in DIMACS:
-16313  16314 -16315  43  16316 0
-16313  16314 -16315  43  16317 0
-16313  16314 -16315  43 -16318 0

c  -2-1 --> break 
c    ( b^{43, 1}_2 ∧  b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧ -p_43) -> break
c  in CNF:
c    -b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨  b^{43, 1}_0 ∨  p_43 ∨ break
c  in DIMACS:
-16313 -16314  16315  43 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 1}_2 ∧ -b^{43, 1}_1 ∧ -b^{43, 1}_0 ∧ true) 
c  in CNF:
c    -b^{43, 1}_2 ∨  b^{43, 1}_1 ∨  b^{43, 1}_0 ∨ false 
c  in DIMACS:
-16313  16314  16315  0

c  3 does not represent an automaton state.
c    -(-b^{43, 1}_2 ∧  b^{43, 1}_1 ∧  b^{43, 1}_0 ∧ true) 
c  in CNF:
c     b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ false 
c  in DIMACS:
 16313 -16314 -16315  0
c  -3 does not represent an automaton state.
c    -( b^{43, 1}_2 ∧  b^{43, 1}_1 ∧  b^{43, 1}_0 ∧ true) 
c  in CNF:
c    -b^{43, 1}_2 ∨ -b^{43, 1}_1 ∨ -b^{43, 1}_0 ∨ false 
c  in DIMACS:
-16313 -16314 -16315  0

c i = 2
c  -2+1 --> -1
c    ( b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧  p_86) -> ( b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0)
c  in CNF:
c    -b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨  b^{43, 3}_2
c    -b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_1
c    -b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨  b^{43, 3}_0
c  in DIMACS:
-16316 -16317  16318 -86  16319 0
-16316 -16317  16318 -86 -16320 0
-16316 -16317  16318 -86  16321 0

c  -1+1 --> 0
c    ( b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0 ∧  p_86) -> (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧ -b^{43, 3}_0)
c  in CNF:
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_2
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_1
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_0
c  in DIMACS:
-16316  16317 -16318 -86 -16319 0
-16316  16317 -16318 -86 -16320 0
-16316  16317 -16318 -86 -16321 0

c  0+1 --> 1
c    (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧  p_86) -> (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0)
c  in CNF:
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_2
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_1
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨  b^{43, 3}_0
c  in DIMACS:
 16316  16317  16318 -86 -16319 0
 16316  16317  16318 -86 -16320 0
 16316  16317  16318 -86  16321 0

c  1+1 --> 2
c    (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0 ∧  p_86) -> (-b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0)
c  in CNF:
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_2
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨  b^{43, 3}_1
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ -p_86 ∨ -b^{43, 3}_0
c  in DIMACS:
 16316  16317 -16318 -86 -16319 0
 16316  16317 -16318 -86  16320 0
 16316  16317 -16318 -86 -16321 0

c  2+1 --> break 
c    (-b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧  p_86) -> break
c  in CNF:
c     b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ -p_86 ∨ break
c  in DIMACS:
 16316 -16317  16318 -86 1162 0


c  2-1 --> 1
c    (-b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧ -p_86) -> (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0)
c  in CNF:
c     b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_2
c     b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_1
c     b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨  b^{43, 3}_0
c  in DIMACS:
 16316 -16317  16318  86 -16319 0
 16316 -16317  16318  86 -16320 0
 16316 -16317  16318  86  16321 0

c  1-1 --> 0
c    (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0 ∧ -p_86) -> (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧ -b^{43, 3}_0)
c  in CNF:
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_2
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_1
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_0
c  in DIMACS:
 16316  16317 -16318  86 -16319 0
 16316  16317 -16318  86 -16320 0
 16316  16317 -16318  86 -16321 0

c  0-1 --> -1
c    (-b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧ -p_86) -> ( b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0)
c  in CNF:
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨  b^{43, 3}_2
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_1
c     b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨  b^{43, 3}_0
c  in DIMACS:
 16316  16317  16318  86  16319 0
 16316  16317  16318  86 -16320 0
 16316  16317  16318  86  16321 0

c  -1-1 --> -2
c    ( b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧  b^{43, 2}_0 ∧ -p_86) -> ( b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0)
c  in CNF:
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨  b^{43, 3}_2
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨  b^{43, 3}_1
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨  p_86 ∨ -b^{43, 3}_0
c  in DIMACS:
-16316  16317 -16318  86  16319 0
-16316  16317 -16318  86  16320 0
-16316  16317 -16318  86 -16321 0

c  -2-1 --> break 
c    ( b^{43, 2}_2 ∧  b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧ -p_86) -> break
c  in CNF:
c    -b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨  b^{43, 2}_0 ∨  p_86 ∨ break
c  in DIMACS:
-16316 -16317  16318  86 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 2}_2 ∧ -b^{43, 2}_1 ∧ -b^{43, 2}_0 ∧ true) 
c  in CNF:
c    -b^{43, 2}_2 ∨  b^{43, 2}_1 ∨  b^{43, 2}_0 ∨ false 
c  in DIMACS:
-16316  16317  16318  0

c  3 does not represent an automaton state.
c    -(-b^{43, 2}_2 ∧  b^{43, 2}_1 ∧  b^{43, 2}_0 ∧ true) 
c  in CNF:
c     b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ false 
c  in DIMACS:
 16316 -16317 -16318  0
c  -3 does not represent an automaton state.
c    -( b^{43, 2}_2 ∧  b^{43, 2}_1 ∧  b^{43, 2}_0 ∧ true) 
c  in CNF:
c    -b^{43, 2}_2 ∨ -b^{43, 2}_1 ∨ -b^{43, 2}_0 ∨ false 
c  in DIMACS:
-16316 -16317 -16318  0

c i = 3
c  -2+1 --> -1
c    ( b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧  p_129) -> ( b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0)
c  in CNF:
c    -b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨  b^{43, 4}_2
c    -b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_1
c    -b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨  b^{43, 4}_0
c  in DIMACS:
-16319 -16320  16321 -129  16322 0
-16319 -16320  16321 -129 -16323 0
-16319 -16320  16321 -129  16324 0

c  -1+1 --> 0
c    ( b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0 ∧  p_129) -> (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧ -b^{43, 4}_0)
c  in CNF:
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_2
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_1
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_0
c  in DIMACS:
-16319  16320 -16321 -129 -16322 0
-16319  16320 -16321 -129 -16323 0
-16319  16320 -16321 -129 -16324 0

c  0+1 --> 1
c    (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧  p_129) -> (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0)
c  in CNF:
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_2
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_1
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨  b^{43, 4}_0
c  in DIMACS:
 16319  16320  16321 -129 -16322 0
 16319  16320  16321 -129 -16323 0
 16319  16320  16321 -129  16324 0

c  1+1 --> 2
c    (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0 ∧  p_129) -> (-b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0)
c  in CNF:
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_2
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨  b^{43, 4}_1
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ -p_129 ∨ -b^{43, 4}_0
c  in DIMACS:
 16319  16320 -16321 -129 -16322 0
 16319  16320 -16321 -129  16323 0
 16319  16320 -16321 -129 -16324 0

c  2+1 --> break 
c    (-b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧  p_129) -> break
c  in CNF:
c     b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ -p_129 ∨ break
c  in DIMACS:
 16319 -16320  16321 -129 1162 0


c  2-1 --> 1
c    (-b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧ -p_129) -> (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0)
c  in CNF:
c     b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_2
c     b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_1
c     b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨  b^{43, 4}_0
c  in DIMACS:
 16319 -16320  16321  129 -16322 0
 16319 -16320  16321  129 -16323 0
 16319 -16320  16321  129  16324 0

c  1-1 --> 0
c    (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0 ∧ -p_129) -> (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧ -b^{43, 4}_0)
c  in CNF:
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_2
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_1
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_0
c  in DIMACS:
 16319  16320 -16321  129 -16322 0
 16319  16320 -16321  129 -16323 0
 16319  16320 -16321  129 -16324 0

c  0-1 --> -1
c    (-b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧ -p_129) -> ( b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0)
c  in CNF:
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨  b^{43, 4}_2
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_1
c     b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨  b^{43, 4}_0
c  in DIMACS:
 16319  16320  16321  129  16322 0
 16319  16320  16321  129 -16323 0
 16319  16320  16321  129  16324 0

c  -1-1 --> -2
c    ( b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧  b^{43, 3}_0 ∧ -p_129) -> ( b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0)
c  in CNF:
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨  b^{43, 4}_2
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨  b^{43, 4}_1
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨  p_129 ∨ -b^{43, 4}_0
c  in DIMACS:
-16319  16320 -16321  129  16322 0
-16319  16320 -16321  129  16323 0
-16319  16320 -16321  129 -16324 0

c  -2-1 --> break 
c    ( b^{43, 3}_2 ∧  b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧ -p_129) -> break
c  in CNF:
c    -b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨  b^{43, 3}_0 ∨  p_129 ∨ break
c  in DIMACS:
-16319 -16320  16321  129 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 3}_2 ∧ -b^{43, 3}_1 ∧ -b^{43, 3}_0 ∧ true) 
c  in CNF:
c    -b^{43, 3}_2 ∨  b^{43, 3}_1 ∨  b^{43, 3}_0 ∨ false 
c  in DIMACS:
-16319  16320  16321  0

c  3 does not represent an automaton state.
c    -(-b^{43, 3}_2 ∧  b^{43, 3}_1 ∧  b^{43, 3}_0 ∧ true) 
c  in CNF:
c     b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ false 
c  in DIMACS:
 16319 -16320 -16321  0
c  -3 does not represent an automaton state.
c    -( b^{43, 3}_2 ∧  b^{43, 3}_1 ∧  b^{43, 3}_0 ∧ true) 
c  in CNF:
c    -b^{43, 3}_2 ∨ -b^{43, 3}_1 ∨ -b^{43, 3}_0 ∨ false 
c  in DIMACS:
-16319 -16320 -16321  0

c i = 4
c  -2+1 --> -1
c    ( b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧  p_172) -> ( b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0)
c  in CNF:
c    -b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨  b^{43, 5}_2
c    -b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_1
c    -b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨  b^{43, 5}_0
c  in DIMACS:
-16322 -16323  16324 -172  16325 0
-16322 -16323  16324 -172 -16326 0
-16322 -16323  16324 -172  16327 0

c  -1+1 --> 0
c    ( b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0 ∧  p_172) -> (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧ -b^{43, 5}_0)
c  in CNF:
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_2
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_1
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_0
c  in DIMACS:
-16322  16323 -16324 -172 -16325 0
-16322  16323 -16324 -172 -16326 0
-16322  16323 -16324 -172 -16327 0

c  0+1 --> 1
c    (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧  p_172) -> (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0)
c  in CNF:
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_2
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_1
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨  b^{43, 5}_0
c  in DIMACS:
 16322  16323  16324 -172 -16325 0
 16322  16323  16324 -172 -16326 0
 16322  16323  16324 -172  16327 0

c  1+1 --> 2
c    (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0 ∧  p_172) -> (-b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0)
c  in CNF:
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_2
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨  b^{43, 5}_1
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ -p_172 ∨ -b^{43, 5}_0
c  in DIMACS:
 16322  16323 -16324 -172 -16325 0
 16322  16323 -16324 -172  16326 0
 16322  16323 -16324 -172 -16327 0

c  2+1 --> break 
c    (-b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧  p_172) -> break
c  in CNF:
c     b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 16322 -16323  16324 -172 1162 0


c  2-1 --> 1
c    (-b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧ -p_172) -> (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0)
c  in CNF:
c     b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_2
c     b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_1
c     b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨  b^{43, 5}_0
c  in DIMACS:
 16322 -16323  16324  172 -16325 0
 16322 -16323  16324  172 -16326 0
 16322 -16323  16324  172  16327 0

c  1-1 --> 0
c    (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0 ∧ -p_172) -> (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧ -b^{43, 5}_0)
c  in CNF:
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_2
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_1
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_0
c  in DIMACS:
 16322  16323 -16324  172 -16325 0
 16322  16323 -16324  172 -16326 0
 16322  16323 -16324  172 -16327 0

c  0-1 --> -1
c    (-b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧ -p_172) -> ( b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0)
c  in CNF:
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨  b^{43, 5}_2
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_1
c     b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨  b^{43, 5}_0
c  in DIMACS:
 16322  16323  16324  172  16325 0
 16322  16323  16324  172 -16326 0
 16322  16323  16324  172  16327 0

c  -1-1 --> -2
c    ( b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧  b^{43, 4}_0 ∧ -p_172) -> ( b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0)
c  in CNF:
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨  b^{43, 5}_2
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨  b^{43, 5}_1
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨  p_172 ∨ -b^{43, 5}_0
c  in DIMACS:
-16322  16323 -16324  172  16325 0
-16322  16323 -16324  172  16326 0
-16322  16323 -16324  172 -16327 0

c  -2-1 --> break 
c    ( b^{43, 4}_2 ∧  b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨  b^{43, 4}_0 ∨  p_172 ∨ break
c  in DIMACS:
-16322 -16323  16324  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 4}_2 ∧ -b^{43, 4}_1 ∧ -b^{43, 4}_0 ∧ true) 
c  in CNF:
c    -b^{43, 4}_2 ∨  b^{43, 4}_1 ∨  b^{43, 4}_0 ∨ false 
c  in DIMACS:
-16322  16323  16324  0

c  3 does not represent an automaton state.
c    -(-b^{43, 4}_2 ∧  b^{43, 4}_1 ∧  b^{43, 4}_0 ∧ true) 
c  in CNF:
c     b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ false 
c  in DIMACS:
 16322 -16323 -16324  0
c  -3 does not represent an automaton state.
c    -( b^{43, 4}_2 ∧  b^{43, 4}_1 ∧  b^{43, 4}_0 ∧ true) 
c  in CNF:
c    -b^{43, 4}_2 ∨ -b^{43, 4}_1 ∨ -b^{43, 4}_0 ∨ false 
c  in DIMACS:
-16322 -16323 -16324  0

c i = 5
c  -2+1 --> -1
c    ( b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧  p_215) -> ( b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0)
c  in CNF:
c    -b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨  b^{43, 6}_2
c    -b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_1
c    -b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨  b^{43, 6}_0
c  in DIMACS:
-16325 -16326  16327 -215  16328 0
-16325 -16326  16327 -215 -16329 0
-16325 -16326  16327 -215  16330 0

c  -1+1 --> 0
c    ( b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0 ∧  p_215) -> (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧ -b^{43, 6}_0)
c  in CNF:
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_2
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_1
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_0
c  in DIMACS:
-16325  16326 -16327 -215 -16328 0
-16325  16326 -16327 -215 -16329 0
-16325  16326 -16327 -215 -16330 0

c  0+1 --> 1
c    (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧  p_215) -> (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0)
c  in CNF:
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_2
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_1
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨  b^{43, 6}_0
c  in DIMACS:
 16325  16326  16327 -215 -16328 0
 16325  16326  16327 -215 -16329 0
 16325  16326  16327 -215  16330 0

c  1+1 --> 2
c    (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0 ∧  p_215) -> (-b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0)
c  in CNF:
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_2
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨  b^{43, 6}_1
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ -p_215 ∨ -b^{43, 6}_0
c  in DIMACS:
 16325  16326 -16327 -215 -16328 0
 16325  16326 -16327 -215  16329 0
 16325  16326 -16327 -215 -16330 0

c  2+1 --> break 
c    (-b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧  p_215) -> break
c  in CNF:
c     b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ -p_215 ∨ break
c  in DIMACS:
 16325 -16326  16327 -215 1162 0


c  2-1 --> 1
c    (-b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧ -p_215) -> (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0)
c  in CNF:
c     b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_2
c     b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_1
c     b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨  b^{43, 6}_0
c  in DIMACS:
 16325 -16326  16327  215 -16328 0
 16325 -16326  16327  215 -16329 0
 16325 -16326  16327  215  16330 0

c  1-1 --> 0
c    (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0 ∧ -p_215) -> (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧ -b^{43, 6}_0)
c  in CNF:
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_2
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_1
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_0
c  in DIMACS:
 16325  16326 -16327  215 -16328 0
 16325  16326 -16327  215 -16329 0
 16325  16326 -16327  215 -16330 0

c  0-1 --> -1
c    (-b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧ -p_215) -> ( b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0)
c  in CNF:
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨  b^{43, 6}_2
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_1
c     b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨  b^{43, 6}_0
c  in DIMACS:
 16325  16326  16327  215  16328 0
 16325  16326  16327  215 -16329 0
 16325  16326  16327  215  16330 0

c  -1-1 --> -2
c    ( b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧  b^{43, 5}_0 ∧ -p_215) -> ( b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0)
c  in CNF:
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨  b^{43, 6}_2
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨  b^{43, 6}_1
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨  p_215 ∨ -b^{43, 6}_0
c  in DIMACS:
-16325  16326 -16327  215  16328 0
-16325  16326 -16327  215  16329 0
-16325  16326 -16327  215 -16330 0

c  -2-1 --> break 
c    ( b^{43, 5}_2 ∧  b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧ -p_215) -> break
c  in CNF:
c    -b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨  b^{43, 5}_0 ∨  p_215 ∨ break
c  in DIMACS:
-16325 -16326  16327  215 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 5}_2 ∧ -b^{43, 5}_1 ∧ -b^{43, 5}_0 ∧ true) 
c  in CNF:
c    -b^{43, 5}_2 ∨  b^{43, 5}_1 ∨  b^{43, 5}_0 ∨ false 
c  in DIMACS:
-16325  16326  16327  0

c  3 does not represent an automaton state.
c    -(-b^{43, 5}_2 ∧  b^{43, 5}_1 ∧  b^{43, 5}_0 ∧ true) 
c  in CNF:
c     b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ false 
c  in DIMACS:
 16325 -16326 -16327  0
c  -3 does not represent an automaton state.
c    -( b^{43, 5}_2 ∧  b^{43, 5}_1 ∧  b^{43, 5}_0 ∧ true) 
c  in CNF:
c    -b^{43, 5}_2 ∨ -b^{43, 5}_1 ∨ -b^{43, 5}_0 ∨ false 
c  in DIMACS:
-16325 -16326 -16327  0

c i = 6
c  -2+1 --> -1
c    ( b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧  p_258) -> ( b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0)
c  in CNF:
c    -b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨  b^{43, 7}_2
c    -b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_1
c    -b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨  b^{43, 7}_0
c  in DIMACS:
-16328 -16329  16330 -258  16331 0
-16328 -16329  16330 -258 -16332 0
-16328 -16329  16330 -258  16333 0

c  -1+1 --> 0
c    ( b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0 ∧  p_258) -> (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧ -b^{43, 7}_0)
c  in CNF:
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_2
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_1
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_0
c  in DIMACS:
-16328  16329 -16330 -258 -16331 0
-16328  16329 -16330 -258 -16332 0
-16328  16329 -16330 -258 -16333 0

c  0+1 --> 1
c    (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧  p_258) -> (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0)
c  in CNF:
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_2
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_1
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨  b^{43, 7}_0
c  in DIMACS:
 16328  16329  16330 -258 -16331 0
 16328  16329  16330 -258 -16332 0
 16328  16329  16330 -258  16333 0

c  1+1 --> 2
c    (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0 ∧  p_258) -> (-b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0)
c  in CNF:
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_2
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨  b^{43, 7}_1
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ -p_258 ∨ -b^{43, 7}_0
c  in DIMACS:
 16328  16329 -16330 -258 -16331 0
 16328  16329 -16330 -258  16332 0
 16328  16329 -16330 -258 -16333 0

c  2+1 --> break 
c    (-b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧  p_258) -> break
c  in CNF:
c     b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 16328 -16329  16330 -258 1162 0


c  2-1 --> 1
c    (-b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧ -p_258) -> (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0)
c  in CNF:
c     b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_2
c     b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_1
c     b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨  b^{43, 7}_0
c  in DIMACS:
 16328 -16329  16330  258 -16331 0
 16328 -16329  16330  258 -16332 0
 16328 -16329  16330  258  16333 0

c  1-1 --> 0
c    (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0 ∧ -p_258) -> (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧ -b^{43, 7}_0)
c  in CNF:
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_2
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_1
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_0
c  in DIMACS:
 16328  16329 -16330  258 -16331 0
 16328  16329 -16330  258 -16332 0
 16328  16329 -16330  258 -16333 0

c  0-1 --> -1
c    (-b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧ -p_258) -> ( b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0)
c  in CNF:
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨  b^{43, 7}_2
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_1
c     b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨  b^{43, 7}_0
c  in DIMACS:
 16328  16329  16330  258  16331 0
 16328  16329  16330  258 -16332 0
 16328  16329  16330  258  16333 0

c  -1-1 --> -2
c    ( b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧  b^{43, 6}_0 ∧ -p_258) -> ( b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0)
c  in CNF:
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨  b^{43, 7}_2
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨  b^{43, 7}_1
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨  p_258 ∨ -b^{43, 7}_0
c  in DIMACS:
-16328  16329 -16330  258  16331 0
-16328  16329 -16330  258  16332 0
-16328  16329 -16330  258 -16333 0

c  -2-1 --> break 
c    ( b^{43, 6}_2 ∧  b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨  b^{43, 6}_0 ∨  p_258 ∨ break
c  in DIMACS:
-16328 -16329  16330  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 6}_2 ∧ -b^{43, 6}_1 ∧ -b^{43, 6}_0 ∧ true) 
c  in CNF:
c    -b^{43, 6}_2 ∨  b^{43, 6}_1 ∨  b^{43, 6}_0 ∨ false 
c  in DIMACS:
-16328  16329  16330  0

c  3 does not represent an automaton state.
c    -(-b^{43, 6}_2 ∧  b^{43, 6}_1 ∧  b^{43, 6}_0 ∧ true) 
c  in CNF:
c     b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ false 
c  in DIMACS:
 16328 -16329 -16330  0
c  -3 does not represent an automaton state.
c    -( b^{43, 6}_2 ∧  b^{43, 6}_1 ∧  b^{43, 6}_0 ∧ true) 
c  in CNF:
c    -b^{43, 6}_2 ∨ -b^{43, 6}_1 ∨ -b^{43, 6}_0 ∨ false 
c  in DIMACS:
-16328 -16329 -16330  0

c i = 7
c  -2+1 --> -1
c    ( b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧  p_301) -> ( b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0)
c  in CNF:
c    -b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨  b^{43, 8}_2
c    -b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_1
c    -b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨  b^{43, 8}_0
c  in DIMACS:
-16331 -16332  16333 -301  16334 0
-16331 -16332  16333 -301 -16335 0
-16331 -16332  16333 -301  16336 0

c  -1+1 --> 0
c    ( b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0 ∧  p_301) -> (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧ -b^{43, 8}_0)
c  in CNF:
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_2
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_1
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_0
c  in DIMACS:
-16331  16332 -16333 -301 -16334 0
-16331  16332 -16333 -301 -16335 0
-16331  16332 -16333 -301 -16336 0

c  0+1 --> 1
c    (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧  p_301) -> (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0)
c  in CNF:
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_2
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_1
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨  b^{43, 8}_0
c  in DIMACS:
 16331  16332  16333 -301 -16334 0
 16331  16332  16333 -301 -16335 0
 16331  16332  16333 -301  16336 0

c  1+1 --> 2
c    (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0 ∧  p_301) -> (-b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0)
c  in CNF:
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_2
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨  b^{43, 8}_1
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ -p_301 ∨ -b^{43, 8}_0
c  in DIMACS:
 16331  16332 -16333 -301 -16334 0
 16331  16332 -16333 -301  16335 0
 16331  16332 -16333 -301 -16336 0

c  2+1 --> break 
c    (-b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧  p_301) -> break
c  in CNF:
c     b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ -p_301 ∨ break
c  in DIMACS:
 16331 -16332  16333 -301 1162 0


c  2-1 --> 1
c    (-b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧ -p_301) -> (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0)
c  in CNF:
c     b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_2
c     b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_1
c     b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨  b^{43, 8}_0
c  in DIMACS:
 16331 -16332  16333  301 -16334 0
 16331 -16332  16333  301 -16335 0
 16331 -16332  16333  301  16336 0

c  1-1 --> 0
c    (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0 ∧ -p_301) -> (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧ -b^{43, 8}_0)
c  in CNF:
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_2
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_1
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_0
c  in DIMACS:
 16331  16332 -16333  301 -16334 0
 16331  16332 -16333  301 -16335 0
 16331  16332 -16333  301 -16336 0

c  0-1 --> -1
c    (-b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧ -p_301) -> ( b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0)
c  in CNF:
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨  b^{43, 8}_2
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_1
c     b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨  b^{43, 8}_0
c  in DIMACS:
 16331  16332  16333  301  16334 0
 16331  16332  16333  301 -16335 0
 16331  16332  16333  301  16336 0

c  -1-1 --> -2
c    ( b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧  b^{43, 7}_0 ∧ -p_301) -> ( b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0)
c  in CNF:
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨  b^{43, 8}_2
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨  b^{43, 8}_1
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨  p_301 ∨ -b^{43, 8}_0
c  in DIMACS:
-16331  16332 -16333  301  16334 0
-16331  16332 -16333  301  16335 0
-16331  16332 -16333  301 -16336 0

c  -2-1 --> break 
c    ( b^{43, 7}_2 ∧  b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧ -p_301) -> break
c  in CNF:
c    -b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨  b^{43, 7}_0 ∨  p_301 ∨ break
c  in DIMACS:
-16331 -16332  16333  301 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 7}_2 ∧ -b^{43, 7}_1 ∧ -b^{43, 7}_0 ∧ true) 
c  in CNF:
c    -b^{43, 7}_2 ∨  b^{43, 7}_1 ∨  b^{43, 7}_0 ∨ false 
c  in DIMACS:
-16331  16332  16333  0

c  3 does not represent an automaton state.
c    -(-b^{43, 7}_2 ∧  b^{43, 7}_1 ∧  b^{43, 7}_0 ∧ true) 
c  in CNF:
c     b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ false 
c  in DIMACS:
 16331 -16332 -16333  0
c  -3 does not represent an automaton state.
c    -( b^{43, 7}_2 ∧  b^{43, 7}_1 ∧  b^{43, 7}_0 ∧ true) 
c  in CNF:
c    -b^{43, 7}_2 ∨ -b^{43, 7}_1 ∨ -b^{43, 7}_0 ∨ false 
c  in DIMACS:
-16331 -16332 -16333  0

c i = 8
c  -2+1 --> -1
c    ( b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧  p_344) -> ( b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0)
c  in CNF:
c    -b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨  b^{43, 9}_2
c    -b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_1
c    -b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨  b^{43, 9}_0
c  in DIMACS:
-16334 -16335  16336 -344  16337 0
-16334 -16335  16336 -344 -16338 0
-16334 -16335  16336 -344  16339 0

c  -1+1 --> 0
c    ( b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0 ∧  p_344) -> (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧ -b^{43, 9}_0)
c  in CNF:
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_2
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_1
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_0
c  in DIMACS:
-16334  16335 -16336 -344 -16337 0
-16334  16335 -16336 -344 -16338 0
-16334  16335 -16336 -344 -16339 0

c  0+1 --> 1
c    (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧  p_344) -> (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0)
c  in CNF:
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_2
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_1
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨  b^{43, 9}_0
c  in DIMACS:
 16334  16335  16336 -344 -16337 0
 16334  16335  16336 -344 -16338 0
 16334  16335  16336 -344  16339 0

c  1+1 --> 2
c    (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0 ∧  p_344) -> (-b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0)
c  in CNF:
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_2
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨  b^{43, 9}_1
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ -p_344 ∨ -b^{43, 9}_0
c  in DIMACS:
 16334  16335 -16336 -344 -16337 0
 16334  16335 -16336 -344  16338 0
 16334  16335 -16336 -344 -16339 0

c  2+1 --> break 
c    (-b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧  p_344) -> break
c  in CNF:
c     b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 16334 -16335  16336 -344 1162 0


c  2-1 --> 1
c    (-b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧ -p_344) -> (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0)
c  in CNF:
c     b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_2
c     b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_1
c     b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨  b^{43, 9}_0
c  in DIMACS:
 16334 -16335  16336  344 -16337 0
 16334 -16335  16336  344 -16338 0
 16334 -16335  16336  344  16339 0

c  1-1 --> 0
c    (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0 ∧ -p_344) -> (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧ -b^{43, 9}_0)
c  in CNF:
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_2
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_1
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_0
c  in DIMACS:
 16334  16335 -16336  344 -16337 0
 16334  16335 -16336  344 -16338 0
 16334  16335 -16336  344 -16339 0

c  0-1 --> -1
c    (-b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧ -p_344) -> ( b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0)
c  in CNF:
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨  b^{43, 9}_2
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_1
c     b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨  b^{43, 9}_0
c  in DIMACS:
 16334  16335  16336  344  16337 0
 16334  16335  16336  344 -16338 0
 16334  16335  16336  344  16339 0

c  -1-1 --> -2
c    ( b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧  b^{43, 8}_0 ∧ -p_344) -> ( b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0)
c  in CNF:
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨  b^{43, 9}_2
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨  b^{43, 9}_1
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨  p_344 ∨ -b^{43, 9}_0
c  in DIMACS:
-16334  16335 -16336  344  16337 0
-16334  16335 -16336  344  16338 0
-16334  16335 -16336  344 -16339 0

c  -2-1 --> break 
c    ( b^{43, 8}_2 ∧  b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨  b^{43, 8}_0 ∨  p_344 ∨ break
c  in DIMACS:
-16334 -16335  16336  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 8}_2 ∧ -b^{43, 8}_1 ∧ -b^{43, 8}_0 ∧ true) 
c  in CNF:
c    -b^{43, 8}_2 ∨  b^{43, 8}_1 ∨  b^{43, 8}_0 ∨ false 
c  in DIMACS:
-16334  16335  16336  0

c  3 does not represent an automaton state.
c    -(-b^{43, 8}_2 ∧  b^{43, 8}_1 ∧  b^{43, 8}_0 ∧ true) 
c  in CNF:
c     b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ false 
c  in DIMACS:
 16334 -16335 -16336  0
c  -3 does not represent an automaton state.
c    -( b^{43, 8}_2 ∧  b^{43, 8}_1 ∧  b^{43, 8}_0 ∧ true) 
c  in CNF:
c    -b^{43, 8}_2 ∨ -b^{43, 8}_1 ∨ -b^{43, 8}_0 ∨ false 
c  in DIMACS:
-16334 -16335 -16336  0

c i = 9
c  -2+1 --> -1
c    ( b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧  p_387) -> ( b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0)
c  in CNF:
c    -b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨  b^{43, 10}_2
c    -b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_1
c    -b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨  b^{43, 10}_0
c  in DIMACS:
-16337 -16338  16339 -387  16340 0
-16337 -16338  16339 -387 -16341 0
-16337 -16338  16339 -387  16342 0

c  -1+1 --> 0
c    ( b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0 ∧  p_387) -> (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧ -b^{43, 10}_0)
c  in CNF:
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_2
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_1
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_0
c  in DIMACS:
-16337  16338 -16339 -387 -16340 0
-16337  16338 -16339 -387 -16341 0
-16337  16338 -16339 -387 -16342 0

c  0+1 --> 1
c    (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧  p_387) -> (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0)
c  in CNF:
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_2
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_1
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨  b^{43, 10}_0
c  in DIMACS:
 16337  16338  16339 -387 -16340 0
 16337  16338  16339 -387 -16341 0
 16337  16338  16339 -387  16342 0

c  1+1 --> 2
c    (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0 ∧  p_387) -> (-b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0)
c  in CNF:
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_2
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨  b^{43, 10}_1
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ -p_387 ∨ -b^{43, 10}_0
c  in DIMACS:
 16337  16338 -16339 -387 -16340 0
 16337  16338 -16339 -387  16341 0
 16337  16338 -16339 -387 -16342 0

c  2+1 --> break 
c    (-b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧  p_387) -> break
c  in CNF:
c     b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 16337 -16338  16339 -387 1162 0


c  2-1 --> 1
c    (-b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧ -p_387) -> (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0)
c  in CNF:
c     b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_2
c     b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_1
c     b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨  b^{43, 10}_0
c  in DIMACS:
 16337 -16338  16339  387 -16340 0
 16337 -16338  16339  387 -16341 0
 16337 -16338  16339  387  16342 0

c  1-1 --> 0
c    (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0 ∧ -p_387) -> (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧ -b^{43, 10}_0)
c  in CNF:
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_2
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_1
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_0
c  in DIMACS:
 16337  16338 -16339  387 -16340 0
 16337  16338 -16339  387 -16341 0
 16337  16338 -16339  387 -16342 0

c  0-1 --> -1
c    (-b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧ -p_387) -> ( b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0)
c  in CNF:
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨  b^{43, 10}_2
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_1
c     b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨  b^{43, 10}_0
c  in DIMACS:
 16337  16338  16339  387  16340 0
 16337  16338  16339  387 -16341 0
 16337  16338  16339  387  16342 0

c  -1-1 --> -2
c    ( b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧  b^{43, 9}_0 ∧ -p_387) -> ( b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0)
c  in CNF:
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨  b^{43, 10}_2
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨  b^{43, 10}_1
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨  p_387 ∨ -b^{43, 10}_0
c  in DIMACS:
-16337  16338 -16339  387  16340 0
-16337  16338 -16339  387  16341 0
-16337  16338 -16339  387 -16342 0

c  -2-1 --> break 
c    ( b^{43, 9}_2 ∧  b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨  b^{43, 9}_0 ∨  p_387 ∨ break
c  in DIMACS:
-16337 -16338  16339  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 9}_2 ∧ -b^{43, 9}_1 ∧ -b^{43, 9}_0 ∧ true) 
c  in CNF:
c    -b^{43, 9}_2 ∨  b^{43, 9}_1 ∨  b^{43, 9}_0 ∨ false 
c  in DIMACS:
-16337  16338  16339  0

c  3 does not represent an automaton state.
c    -(-b^{43, 9}_2 ∧  b^{43, 9}_1 ∧  b^{43, 9}_0 ∧ true) 
c  in CNF:
c     b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ false 
c  in DIMACS:
 16337 -16338 -16339  0
c  -3 does not represent an automaton state.
c    -( b^{43, 9}_2 ∧  b^{43, 9}_1 ∧  b^{43, 9}_0 ∧ true) 
c  in CNF:
c    -b^{43, 9}_2 ∨ -b^{43, 9}_1 ∨ -b^{43, 9}_0 ∨ false 
c  in DIMACS:
-16337 -16338 -16339  0

c i = 10
c  -2+1 --> -1
c    ( b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧  p_430) -> ( b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0)
c  in CNF:
c    -b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨  b^{43, 11}_2
c    -b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_1
c    -b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨  b^{43, 11}_0
c  in DIMACS:
-16340 -16341  16342 -430  16343 0
-16340 -16341  16342 -430 -16344 0
-16340 -16341  16342 -430  16345 0

c  -1+1 --> 0
c    ( b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0 ∧  p_430) -> (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧ -b^{43, 11}_0)
c  in CNF:
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_2
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_1
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_0
c  in DIMACS:
-16340  16341 -16342 -430 -16343 0
-16340  16341 -16342 -430 -16344 0
-16340  16341 -16342 -430 -16345 0

c  0+1 --> 1
c    (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧  p_430) -> (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0)
c  in CNF:
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_2
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_1
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨  b^{43, 11}_0
c  in DIMACS:
 16340  16341  16342 -430 -16343 0
 16340  16341  16342 -430 -16344 0
 16340  16341  16342 -430  16345 0

c  1+1 --> 2
c    (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0 ∧  p_430) -> (-b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0)
c  in CNF:
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_2
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨  b^{43, 11}_1
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ -p_430 ∨ -b^{43, 11}_0
c  in DIMACS:
 16340  16341 -16342 -430 -16343 0
 16340  16341 -16342 -430  16344 0
 16340  16341 -16342 -430 -16345 0

c  2+1 --> break 
c    (-b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧  p_430) -> break
c  in CNF:
c     b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 16340 -16341  16342 -430 1162 0


c  2-1 --> 1
c    (-b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧ -p_430) -> (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0)
c  in CNF:
c     b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_2
c     b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_1
c     b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨  b^{43, 11}_0
c  in DIMACS:
 16340 -16341  16342  430 -16343 0
 16340 -16341  16342  430 -16344 0
 16340 -16341  16342  430  16345 0

c  1-1 --> 0
c    (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0 ∧ -p_430) -> (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧ -b^{43, 11}_0)
c  in CNF:
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_2
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_1
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_0
c  in DIMACS:
 16340  16341 -16342  430 -16343 0
 16340  16341 -16342  430 -16344 0
 16340  16341 -16342  430 -16345 0

c  0-1 --> -1
c    (-b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧ -p_430) -> ( b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0)
c  in CNF:
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨  b^{43, 11}_2
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_1
c     b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨  b^{43, 11}_0
c  in DIMACS:
 16340  16341  16342  430  16343 0
 16340  16341  16342  430 -16344 0
 16340  16341  16342  430  16345 0

c  -1-1 --> -2
c    ( b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧  b^{43, 10}_0 ∧ -p_430) -> ( b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0)
c  in CNF:
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨  b^{43, 11}_2
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨  b^{43, 11}_1
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨  p_430 ∨ -b^{43, 11}_0
c  in DIMACS:
-16340  16341 -16342  430  16343 0
-16340  16341 -16342  430  16344 0
-16340  16341 -16342  430 -16345 0

c  -2-1 --> break 
c    ( b^{43, 10}_2 ∧  b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨  b^{43, 10}_0 ∨  p_430 ∨ break
c  in DIMACS:
-16340 -16341  16342  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 10}_2 ∧ -b^{43, 10}_1 ∧ -b^{43, 10}_0 ∧ true) 
c  in CNF:
c    -b^{43, 10}_2 ∨  b^{43, 10}_1 ∨  b^{43, 10}_0 ∨ false 
c  in DIMACS:
-16340  16341  16342  0

c  3 does not represent an automaton state.
c    -(-b^{43, 10}_2 ∧  b^{43, 10}_1 ∧  b^{43, 10}_0 ∧ true) 
c  in CNF:
c     b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ false 
c  in DIMACS:
 16340 -16341 -16342  0
c  -3 does not represent an automaton state.
c    -( b^{43, 10}_2 ∧  b^{43, 10}_1 ∧  b^{43, 10}_0 ∧ true) 
c  in CNF:
c    -b^{43, 10}_2 ∨ -b^{43, 10}_1 ∨ -b^{43, 10}_0 ∨ false 
c  in DIMACS:
-16340 -16341 -16342  0

c i = 11
c  -2+1 --> -1
c    ( b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧  p_473) -> ( b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0)
c  in CNF:
c    -b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨  b^{43, 12}_2
c    -b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_1
c    -b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨  b^{43, 12}_0
c  in DIMACS:
-16343 -16344  16345 -473  16346 0
-16343 -16344  16345 -473 -16347 0
-16343 -16344  16345 -473  16348 0

c  -1+1 --> 0
c    ( b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0 ∧  p_473) -> (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧ -b^{43, 12}_0)
c  in CNF:
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_2
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_1
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_0
c  in DIMACS:
-16343  16344 -16345 -473 -16346 0
-16343  16344 -16345 -473 -16347 0
-16343  16344 -16345 -473 -16348 0

c  0+1 --> 1
c    (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧  p_473) -> (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0)
c  in CNF:
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_2
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_1
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨  b^{43, 12}_0
c  in DIMACS:
 16343  16344  16345 -473 -16346 0
 16343  16344  16345 -473 -16347 0
 16343  16344  16345 -473  16348 0

c  1+1 --> 2
c    (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0 ∧  p_473) -> (-b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0)
c  in CNF:
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_2
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨  b^{43, 12}_1
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ -p_473 ∨ -b^{43, 12}_0
c  in DIMACS:
 16343  16344 -16345 -473 -16346 0
 16343  16344 -16345 -473  16347 0
 16343  16344 -16345 -473 -16348 0

c  2+1 --> break 
c    (-b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧  p_473) -> break
c  in CNF:
c     b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ -p_473 ∨ break
c  in DIMACS:
 16343 -16344  16345 -473 1162 0


c  2-1 --> 1
c    (-b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧ -p_473) -> (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0)
c  in CNF:
c     b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_2
c     b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_1
c     b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨  b^{43, 12}_0
c  in DIMACS:
 16343 -16344  16345  473 -16346 0
 16343 -16344  16345  473 -16347 0
 16343 -16344  16345  473  16348 0

c  1-1 --> 0
c    (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0 ∧ -p_473) -> (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧ -b^{43, 12}_0)
c  in CNF:
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_2
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_1
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_0
c  in DIMACS:
 16343  16344 -16345  473 -16346 0
 16343  16344 -16345  473 -16347 0
 16343  16344 -16345  473 -16348 0

c  0-1 --> -1
c    (-b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧ -p_473) -> ( b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0)
c  in CNF:
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨  b^{43, 12}_2
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_1
c     b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨  b^{43, 12}_0
c  in DIMACS:
 16343  16344  16345  473  16346 0
 16343  16344  16345  473 -16347 0
 16343  16344  16345  473  16348 0

c  -1-1 --> -2
c    ( b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧  b^{43, 11}_0 ∧ -p_473) -> ( b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0)
c  in CNF:
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨  b^{43, 12}_2
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨  b^{43, 12}_1
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨  p_473 ∨ -b^{43, 12}_0
c  in DIMACS:
-16343  16344 -16345  473  16346 0
-16343  16344 -16345  473  16347 0
-16343  16344 -16345  473 -16348 0

c  -2-1 --> break 
c    ( b^{43, 11}_2 ∧  b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧ -p_473) -> break
c  in CNF:
c    -b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨  b^{43, 11}_0 ∨  p_473 ∨ break
c  in DIMACS:
-16343 -16344  16345  473 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 11}_2 ∧ -b^{43, 11}_1 ∧ -b^{43, 11}_0 ∧ true) 
c  in CNF:
c    -b^{43, 11}_2 ∨  b^{43, 11}_1 ∨  b^{43, 11}_0 ∨ false 
c  in DIMACS:
-16343  16344  16345  0

c  3 does not represent an automaton state.
c    -(-b^{43, 11}_2 ∧  b^{43, 11}_1 ∧  b^{43, 11}_0 ∧ true) 
c  in CNF:
c     b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ false 
c  in DIMACS:
 16343 -16344 -16345  0
c  -3 does not represent an automaton state.
c    -( b^{43, 11}_2 ∧  b^{43, 11}_1 ∧  b^{43, 11}_0 ∧ true) 
c  in CNF:
c    -b^{43, 11}_2 ∨ -b^{43, 11}_1 ∨ -b^{43, 11}_0 ∨ false 
c  in DIMACS:
-16343 -16344 -16345  0

c i = 12
c  -2+1 --> -1
c    ( b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧  p_516) -> ( b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0)
c  in CNF:
c    -b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨  b^{43, 13}_2
c    -b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_1
c    -b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨  b^{43, 13}_0
c  in DIMACS:
-16346 -16347  16348 -516  16349 0
-16346 -16347  16348 -516 -16350 0
-16346 -16347  16348 -516  16351 0

c  -1+1 --> 0
c    ( b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0 ∧  p_516) -> (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧ -b^{43, 13}_0)
c  in CNF:
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_2
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_1
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_0
c  in DIMACS:
-16346  16347 -16348 -516 -16349 0
-16346  16347 -16348 -516 -16350 0
-16346  16347 -16348 -516 -16351 0

c  0+1 --> 1
c    (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧  p_516) -> (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0)
c  in CNF:
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_2
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_1
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨  b^{43, 13}_0
c  in DIMACS:
 16346  16347  16348 -516 -16349 0
 16346  16347  16348 -516 -16350 0
 16346  16347  16348 -516  16351 0

c  1+1 --> 2
c    (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0 ∧  p_516) -> (-b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0)
c  in CNF:
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_2
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨  b^{43, 13}_1
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ -p_516 ∨ -b^{43, 13}_0
c  in DIMACS:
 16346  16347 -16348 -516 -16349 0
 16346  16347 -16348 -516  16350 0
 16346  16347 -16348 -516 -16351 0

c  2+1 --> break 
c    (-b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧  p_516) -> break
c  in CNF:
c     b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 16346 -16347  16348 -516 1162 0


c  2-1 --> 1
c    (-b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧ -p_516) -> (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0)
c  in CNF:
c     b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_2
c     b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_1
c     b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨  b^{43, 13}_0
c  in DIMACS:
 16346 -16347  16348  516 -16349 0
 16346 -16347  16348  516 -16350 0
 16346 -16347  16348  516  16351 0

c  1-1 --> 0
c    (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0 ∧ -p_516) -> (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧ -b^{43, 13}_0)
c  in CNF:
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_2
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_1
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_0
c  in DIMACS:
 16346  16347 -16348  516 -16349 0
 16346  16347 -16348  516 -16350 0
 16346  16347 -16348  516 -16351 0

c  0-1 --> -1
c    (-b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧ -p_516) -> ( b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0)
c  in CNF:
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨  b^{43, 13}_2
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_1
c     b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨  b^{43, 13}_0
c  in DIMACS:
 16346  16347  16348  516  16349 0
 16346  16347  16348  516 -16350 0
 16346  16347  16348  516  16351 0

c  -1-1 --> -2
c    ( b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧  b^{43, 12}_0 ∧ -p_516) -> ( b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0)
c  in CNF:
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨  b^{43, 13}_2
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨  b^{43, 13}_1
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨  p_516 ∨ -b^{43, 13}_0
c  in DIMACS:
-16346  16347 -16348  516  16349 0
-16346  16347 -16348  516  16350 0
-16346  16347 -16348  516 -16351 0

c  -2-1 --> break 
c    ( b^{43, 12}_2 ∧  b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨  b^{43, 12}_0 ∨  p_516 ∨ break
c  in DIMACS:
-16346 -16347  16348  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 12}_2 ∧ -b^{43, 12}_1 ∧ -b^{43, 12}_0 ∧ true) 
c  in CNF:
c    -b^{43, 12}_2 ∨  b^{43, 12}_1 ∨  b^{43, 12}_0 ∨ false 
c  in DIMACS:
-16346  16347  16348  0

c  3 does not represent an automaton state.
c    -(-b^{43, 12}_2 ∧  b^{43, 12}_1 ∧  b^{43, 12}_0 ∧ true) 
c  in CNF:
c     b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ false 
c  in DIMACS:
 16346 -16347 -16348  0
c  -3 does not represent an automaton state.
c    -( b^{43, 12}_2 ∧  b^{43, 12}_1 ∧  b^{43, 12}_0 ∧ true) 
c  in CNF:
c    -b^{43, 12}_2 ∨ -b^{43, 12}_1 ∨ -b^{43, 12}_0 ∨ false 
c  in DIMACS:
-16346 -16347 -16348  0

c i = 13
c  -2+1 --> -1
c    ( b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧  p_559) -> ( b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0)
c  in CNF:
c    -b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨  b^{43, 14}_2
c    -b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_1
c    -b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨  b^{43, 14}_0
c  in DIMACS:
-16349 -16350  16351 -559  16352 0
-16349 -16350  16351 -559 -16353 0
-16349 -16350  16351 -559  16354 0

c  -1+1 --> 0
c    ( b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0 ∧  p_559) -> (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧ -b^{43, 14}_0)
c  in CNF:
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_2
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_1
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_0
c  in DIMACS:
-16349  16350 -16351 -559 -16352 0
-16349  16350 -16351 -559 -16353 0
-16349  16350 -16351 -559 -16354 0

c  0+1 --> 1
c    (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧  p_559) -> (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0)
c  in CNF:
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_2
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_1
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨  b^{43, 14}_0
c  in DIMACS:
 16349  16350  16351 -559 -16352 0
 16349  16350  16351 -559 -16353 0
 16349  16350  16351 -559  16354 0

c  1+1 --> 2
c    (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0 ∧  p_559) -> (-b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0)
c  in CNF:
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_2
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨  b^{43, 14}_1
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ -p_559 ∨ -b^{43, 14}_0
c  in DIMACS:
 16349  16350 -16351 -559 -16352 0
 16349  16350 -16351 -559  16353 0
 16349  16350 -16351 -559 -16354 0

c  2+1 --> break 
c    (-b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧  p_559) -> break
c  in CNF:
c     b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ -p_559 ∨ break
c  in DIMACS:
 16349 -16350  16351 -559 1162 0


c  2-1 --> 1
c    (-b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧ -p_559) -> (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0)
c  in CNF:
c     b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_2
c     b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_1
c     b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨  b^{43, 14}_0
c  in DIMACS:
 16349 -16350  16351  559 -16352 0
 16349 -16350  16351  559 -16353 0
 16349 -16350  16351  559  16354 0

c  1-1 --> 0
c    (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0 ∧ -p_559) -> (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧ -b^{43, 14}_0)
c  in CNF:
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_2
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_1
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_0
c  in DIMACS:
 16349  16350 -16351  559 -16352 0
 16349  16350 -16351  559 -16353 0
 16349  16350 -16351  559 -16354 0

c  0-1 --> -1
c    (-b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧ -p_559) -> ( b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0)
c  in CNF:
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨  b^{43, 14}_2
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_1
c     b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨  b^{43, 14}_0
c  in DIMACS:
 16349  16350  16351  559  16352 0
 16349  16350  16351  559 -16353 0
 16349  16350  16351  559  16354 0

c  -1-1 --> -2
c    ( b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧  b^{43, 13}_0 ∧ -p_559) -> ( b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0)
c  in CNF:
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨  b^{43, 14}_2
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨  b^{43, 14}_1
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨  p_559 ∨ -b^{43, 14}_0
c  in DIMACS:
-16349  16350 -16351  559  16352 0
-16349  16350 -16351  559  16353 0
-16349  16350 -16351  559 -16354 0

c  -2-1 --> break 
c    ( b^{43, 13}_2 ∧  b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧ -p_559) -> break
c  in CNF:
c    -b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨  b^{43, 13}_0 ∨  p_559 ∨ break
c  in DIMACS:
-16349 -16350  16351  559 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 13}_2 ∧ -b^{43, 13}_1 ∧ -b^{43, 13}_0 ∧ true) 
c  in CNF:
c    -b^{43, 13}_2 ∨  b^{43, 13}_1 ∨  b^{43, 13}_0 ∨ false 
c  in DIMACS:
-16349  16350  16351  0

c  3 does not represent an automaton state.
c    -(-b^{43, 13}_2 ∧  b^{43, 13}_1 ∧  b^{43, 13}_0 ∧ true) 
c  in CNF:
c     b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ false 
c  in DIMACS:
 16349 -16350 -16351  0
c  -3 does not represent an automaton state.
c    -( b^{43, 13}_2 ∧  b^{43, 13}_1 ∧  b^{43, 13}_0 ∧ true) 
c  in CNF:
c    -b^{43, 13}_2 ∨ -b^{43, 13}_1 ∨ -b^{43, 13}_0 ∨ false 
c  in DIMACS:
-16349 -16350 -16351  0

c i = 14
c  -2+1 --> -1
c    ( b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧  p_602) -> ( b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0)
c  in CNF:
c    -b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨  b^{43, 15}_2
c    -b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_1
c    -b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨  b^{43, 15}_0
c  in DIMACS:
-16352 -16353  16354 -602  16355 0
-16352 -16353  16354 -602 -16356 0
-16352 -16353  16354 -602  16357 0

c  -1+1 --> 0
c    ( b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0 ∧  p_602) -> (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧ -b^{43, 15}_0)
c  in CNF:
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_2
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_1
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_0
c  in DIMACS:
-16352  16353 -16354 -602 -16355 0
-16352  16353 -16354 -602 -16356 0
-16352  16353 -16354 -602 -16357 0

c  0+1 --> 1
c    (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧  p_602) -> (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0)
c  in CNF:
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_2
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_1
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨  b^{43, 15}_0
c  in DIMACS:
 16352  16353  16354 -602 -16355 0
 16352  16353  16354 -602 -16356 0
 16352  16353  16354 -602  16357 0

c  1+1 --> 2
c    (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0 ∧  p_602) -> (-b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0)
c  in CNF:
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_2
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨  b^{43, 15}_1
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ -p_602 ∨ -b^{43, 15}_0
c  in DIMACS:
 16352  16353 -16354 -602 -16355 0
 16352  16353 -16354 -602  16356 0
 16352  16353 -16354 -602 -16357 0

c  2+1 --> break 
c    (-b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧  p_602) -> break
c  in CNF:
c     b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 16352 -16353  16354 -602 1162 0


c  2-1 --> 1
c    (-b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧ -p_602) -> (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0)
c  in CNF:
c     b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_2
c     b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_1
c     b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨  b^{43, 15}_0
c  in DIMACS:
 16352 -16353  16354  602 -16355 0
 16352 -16353  16354  602 -16356 0
 16352 -16353  16354  602  16357 0

c  1-1 --> 0
c    (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0 ∧ -p_602) -> (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧ -b^{43, 15}_0)
c  in CNF:
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_2
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_1
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_0
c  in DIMACS:
 16352  16353 -16354  602 -16355 0
 16352  16353 -16354  602 -16356 0
 16352  16353 -16354  602 -16357 0

c  0-1 --> -1
c    (-b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧ -p_602) -> ( b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0)
c  in CNF:
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨  b^{43, 15}_2
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_1
c     b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨  b^{43, 15}_0
c  in DIMACS:
 16352  16353  16354  602  16355 0
 16352  16353  16354  602 -16356 0
 16352  16353  16354  602  16357 0

c  -1-1 --> -2
c    ( b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧  b^{43, 14}_0 ∧ -p_602) -> ( b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0)
c  in CNF:
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨  b^{43, 15}_2
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨  b^{43, 15}_1
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨  p_602 ∨ -b^{43, 15}_0
c  in DIMACS:
-16352  16353 -16354  602  16355 0
-16352  16353 -16354  602  16356 0
-16352  16353 -16354  602 -16357 0

c  -2-1 --> break 
c    ( b^{43, 14}_2 ∧  b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨  b^{43, 14}_0 ∨  p_602 ∨ break
c  in DIMACS:
-16352 -16353  16354  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 14}_2 ∧ -b^{43, 14}_1 ∧ -b^{43, 14}_0 ∧ true) 
c  in CNF:
c    -b^{43, 14}_2 ∨  b^{43, 14}_1 ∨  b^{43, 14}_0 ∨ false 
c  in DIMACS:
-16352  16353  16354  0

c  3 does not represent an automaton state.
c    -(-b^{43, 14}_2 ∧  b^{43, 14}_1 ∧  b^{43, 14}_0 ∧ true) 
c  in CNF:
c     b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ false 
c  in DIMACS:
 16352 -16353 -16354  0
c  -3 does not represent an automaton state.
c    -( b^{43, 14}_2 ∧  b^{43, 14}_1 ∧  b^{43, 14}_0 ∧ true) 
c  in CNF:
c    -b^{43, 14}_2 ∨ -b^{43, 14}_1 ∨ -b^{43, 14}_0 ∨ false 
c  in DIMACS:
-16352 -16353 -16354  0

c i = 15
c  -2+1 --> -1
c    ( b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧  p_645) -> ( b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0)
c  in CNF:
c    -b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨  b^{43, 16}_2
c    -b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_1
c    -b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨  b^{43, 16}_0
c  in DIMACS:
-16355 -16356  16357 -645  16358 0
-16355 -16356  16357 -645 -16359 0
-16355 -16356  16357 -645  16360 0

c  -1+1 --> 0
c    ( b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0 ∧  p_645) -> (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧ -b^{43, 16}_0)
c  in CNF:
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_2
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_1
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_0
c  in DIMACS:
-16355  16356 -16357 -645 -16358 0
-16355  16356 -16357 -645 -16359 0
-16355  16356 -16357 -645 -16360 0

c  0+1 --> 1
c    (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧  p_645) -> (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0)
c  in CNF:
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_2
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_1
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨  b^{43, 16}_0
c  in DIMACS:
 16355  16356  16357 -645 -16358 0
 16355  16356  16357 -645 -16359 0
 16355  16356  16357 -645  16360 0

c  1+1 --> 2
c    (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0 ∧  p_645) -> (-b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0)
c  in CNF:
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_2
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨  b^{43, 16}_1
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ -p_645 ∨ -b^{43, 16}_0
c  in DIMACS:
 16355  16356 -16357 -645 -16358 0
 16355  16356 -16357 -645  16359 0
 16355  16356 -16357 -645 -16360 0

c  2+1 --> break 
c    (-b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧  p_645) -> break
c  in CNF:
c     b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 16355 -16356  16357 -645 1162 0


c  2-1 --> 1
c    (-b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧ -p_645) -> (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0)
c  in CNF:
c     b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_2
c     b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_1
c     b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨  b^{43, 16}_0
c  in DIMACS:
 16355 -16356  16357  645 -16358 0
 16355 -16356  16357  645 -16359 0
 16355 -16356  16357  645  16360 0

c  1-1 --> 0
c    (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0 ∧ -p_645) -> (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧ -b^{43, 16}_0)
c  in CNF:
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_2
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_1
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_0
c  in DIMACS:
 16355  16356 -16357  645 -16358 0
 16355  16356 -16357  645 -16359 0
 16355  16356 -16357  645 -16360 0

c  0-1 --> -1
c    (-b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧ -p_645) -> ( b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0)
c  in CNF:
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨  b^{43, 16}_2
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_1
c     b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨  b^{43, 16}_0
c  in DIMACS:
 16355  16356  16357  645  16358 0
 16355  16356  16357  645 -16359 0
 16355  16356  16357  645  16360 0

c  -1-1 --> -2
c    ( b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧  b^{43, 15}_0 ∧ -p_645) -> ( b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0)
c  in CNF:
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨  b^{43, 16}_2
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨  b^{43, 16}_1
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨  p_645 ∨ -b^{43, 16}_0
c  in DIMACS:
-16355  16356 -16357  645  16358 0
-16355  16356 -16357  645  16359 0
-16355  16356 -16357  645 -16360 0

c  -2-1 --> break 
c    ( b^{43, 15}_2 ∧  b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨  b^{43, 15}_0 ∨  p_645 ∨ break
c  in DIMACS:
-16355 -16356  16357  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 15}_2 ∧ -b^{43, 15}_1 ∧ -b^{43, 15}_0 ∧ true) 
c  in CNF:
c    -b^{43, 15}_2 ∨  b^{43, 15}_1 ∨  b^{43, 15}_0 ∨ false 
c  in DIMACS:
-16355  16356  16357  0

c  3 does not represent an automaton state.
c    -(-b^{43, 15}_2 ∧  b^{43, 15}_1 ∧  b^{43, 15}_0 ∧ true) 
c  in CNF:
c     b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ false 
c  in DIMACS:
 16355 -16356 -16357  0
c  -3 does not represent an automaton state.
c    -( b^{43, 15}_2 ∧  b^{43, 15}_1 ∧  b^{43, 15}_0 ∧ true) 
c  in CNF:
c    -b^{43, 15}_2 ∨ -b^{43, 15}_1 ∨ -b^{43, 15}_0 ∨ false 
c  in DIMACS:
-16355 -16356 -16357  0

c i = 16
c  -2+1 --> -1
c    ( b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧  p_688) -> ( b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0)
c  in CNF:
c    -b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨  b^{43, 17}_2
c    -b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_1
c    -b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨  b^{43, 17}_0
c  in DIMACS:
-16358 -16359  16360 -688  16361 0
-16358 -16359  16360 -688 -16362 0
-16358 -16359  16360 -688  16363 0

c  -1+1 --> 0
c    ( b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0 ∧  p_688) -> (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧ -b^{43, 17}_0)
c  in CNF:
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_2
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_1
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_0
c  in DIMACS:
-16358  16359 -16360 -688 -16361 0
-16358  16359 -16360 -688 -16362 0
-16358  16359 -16360 -688 -16363 0

c  0+1 --> 1
c    (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧  p_688) -> (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0)
c  in CNF:
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_2
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_1
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨  b^{43, 17}_0
c  in DIMACS:
 16358  16359  16360 -688 -16361 0
 16358  16359  16360 -688 -16362 0
 16358  16359  16360 -688  16363 0

c  1+1 --> 2
c    (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0 ∧  p_688) -> (-b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0)
c  in CNF:
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_2
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨  b^{43, 17}_1
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ -p_688 ∨ -b^{43, 17}_0
c  in DIMACS:
 16358  16359 -16360 -688 -16361 0
 16358  16359 -16360 -688  16362 0
 16358  16359 -16360 -688 -16363 0

c  2+1 --> break 
c    (-b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧  p_688) -> break
c  in CNF:
c     b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 16358 -16359  16360 -688 1162 0


c  2-1 --> 1
c    (-b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧ -p_688) -> (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0)
c  in CNF:
c     b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_2
c     b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_1
c     b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨  b^{43, 17}_0
c  in DIMACS:
 16358 -16359  16360  688 -16361 0
 16358 -16359  16360  688 -16362 0
 16358 -16359  16360  688  16363 0

c  1-1 --> 0
c    (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0 ∧ -p_688) -> (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧ -b^{43, 17}_0)
c  in CNF:
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_2
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_1
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_0
c  in DIMACS:
 16358  16359 -16360  688 -16361 0
 16358  16359 -16360  688 -16362 0
 16358  16359 -16360  688 -16363 0

c  0-1 --> -1
c    (-b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧ -p_688) -> ( b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0)
c  in CNF:
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨  b^{43, 17}_2
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_1
c     b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨  b^{43, 17}_0
c  in DIMACS:
 16358  16359  16360  688  16361 0
 16358  16359  16360  688 -16362 0
 16358  16359  16360  688  16363 0

c  -1-1 --> -2
c    ( b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧  b^{43, 16}_0 ∧ -p_688) -> ( b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0)
c  in CNF:
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨  b^{43, 17}_2
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨  b^{43, 17}_1
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨  p_688 ∨ -b^{43, 17}_0
c  in DIMACS:
-16358  16359 -16360  688  16361 0
-16358  16359 -16360  688  16362 0
-16358  16359 -16360  688 -16363 0

c  -2-1 --> break 
c    ( b^{43, 16}_2 ∧  b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨  b^{43, 16}_0 ∨  p_688 ∨ break
c  in DIMACS:
-16358 -16359  16360  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 16}_2 ∧ -b^{43, 16}_1 ∧ -b^{43, 16}_0 ∧ true) 
c  in CNF:
c    -b^{43, 16}_2 ∨  b^{43, 16}_1 ∨  b^{43, 16}_0 ∨ false 
c  in DIMACS:
-16358  16359  16360  0

c  3 does not represent an automaton state.
c    -(-b^{43, 16}_2 ∧  b^{43, 16}_1 ∧  b^{43, 16}_0 ∧ true) 
c  in CNF:
c     b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ false 
c  in DIMACS:
 16358 -16359 -16360  0
c  -3 does not represent an automaton state.
c    -( b^{43, 16}_2 ∧  b^{43, 16}_1 ∧  b^{43, 16}_0 ∧ true) 
c  in CNF:
c    -b^{43, 16}_2 ∨ -b^{43, 16}_1 ∨ -b^{43, 16}_0 ∨ false 
c  in DIMACS:
-16358 -16359 -16360  0

c i = 17
c  -2+1 --> -1
c    ( b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧  p_731) -> ( b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0)
c  in CNF:
c    -b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨  b^{43, 18}_2
c    -b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_1
c    -b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨  b^{43, 18}_0
c  in DIMACS:
-16361 -16362  16363 -731  16364 0
-16361 -16362  16363 -731 -16365 0
-16361 -16362  16363 -731  16366 0

c  -1+1 --> 0
c    ( b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0 ∧  p_731) -> (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧ -b^{43, 18}_0)
c  in CNF:
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_2
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_1
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_0
c  in DIMACS:
-16361  16362 -16363 -731 -16364 0
-16361  16362 -16363 -731 -16365 0
-16361  16362 -16363 -731 -16366 0

c  0+1 --> 1
c    (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧  p_731) -> (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0)
c  in CNF:
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_2
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_1
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨  b^{43, 18}_0
c  in DIMACS:
 16361  16362  16363 -731 -16364 0
 16361  16362  16363 -731 -16365 0
 16361  16362  16363 -731  16366 0

c  1+1 --> 2
c    (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0 ∧  p_731) -> (-b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0)
c  in CNF:
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_2
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨  b^{43, 18}_1
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ -p_731 ∨ -b^{43, 18}_0
c  in DIMACS:
 16361  16362 -16363 -731 -16364 0
 16361  16362 -16363 -731  16365 0
 16361  16362 -16363 -731 -16366 0

c  2+1 --> break 
c    (-b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧  p_731) -> break
c  in CNF:
c     b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ -p_731 ∨ break
c  in DIMACS:
 16361 -16362  16363 -731 1162 0


c  2-1 --> 1
c    (-b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧ -p_731) -> (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0)
c  in CNF:
c     b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_2
c     b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_1
c     b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨  b^{43, 18}_0
c  in DIMACS:
 16361 -16362  16363  731 -16364 0
 16361 -16362  16363  731 -16365 0
 16361 -16362  16363  731  16366 0

c  1-1 --> 0
c    (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0 ∧ -p_731) -> (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧ -b^{43, 18}_0)
c  in CNF:
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_2
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_1
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_0
c  in DIMACS:
 16361  16362 -16363  731 -16364 0
 16361  16362 -16363  731 -16365 0
 16361  16362 -16363  731 -16366 0

c  0-1 --> -1
c    (-b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧ -p_731) -> ( b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0)
c  in CNF:
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨  b^{43, 18}_2
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_1
c     b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨  b^{43, 18}_0
c  in DIMACS:
 16361  16362  16363  731  16364 0
 16361  16362  16363  731 -16365 0
 16361  16362  16363  731  16366 0

c  -1-1 --> -2
c    ( b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧  b^{43, 17}_0 ∧ -p_731) -> ( b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0)
c  in CNF:
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨  b^{43, 18}_2
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨  b^{43, 18}_1
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨  p_731 ∨ -b^{43, 18}_0
c  in DIMACS:
-16361  16362 -16363  731  16364 0
-16361  16362 -16363  731  16365 0
-16361  16362 -16363  731 -16366 0

c  -2-1 --> break 
c    ( b^{43, 17}_2 ∧  b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧ -p_731) -> break
c  in CNF:
c    -b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨  b^{43, 17}_0 ∨  p_731 ∨ break
c  in DIMACS:
-16361 -16362  16363  731 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 17}_2 ∧ -b^{43, 17}_1 ∧ -b^{43, 17}_0 ∧ true) 
c  in CNF:
c    -b^{43, 17}_2 ∨  b^{43, 17}_1 ∨  b^{43, 17}_0 ∨ false 
c  in DIMACS:
-16361  16362  16363  0

c  3 does not represent an automaton state.
c    -(-b^{43, 17}_2 ∧  b^{43, 17}_1 ∧  b^{43, 17}_0 ∧ true) 
c  in CNF:
c     b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ false 
c  in DIMACS:
 16361 -16362 -16363  0
c  -3 does not represent an automaton state.
c    -( b^{43, 17}_2 ∧  b^{43, 17}_1 ∧  b^{43, 17}_0 ∧ true) 
c  in CNF:
c    -b^{43, 17}_2 ∨ -b^{43, 17}_1 ∨ -b^{43, 17}_0 ∨ false 
c  in DIMACS:
-16361 -16362 -16363  0

c i = 18
c  -2+1 --> -1
c    ( b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧  p_774) -> ( b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0)
c  in CNF:
c    -b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨  b^{43, 19}_2
c    -b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_1
c    -b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨  b^{43, 19}_0
c  in DIMACS:
-16364 -16365  16366 -774  16367 0
-16364 -16365  16366 -774 -16368 0
-16364 -16365  16366 -774  16369 0

c  -1+1 --> 0
c    ( b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0 ∧  p_774) -> (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧ -b^{43, 19}_0)
c  in CNF:
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_2
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_1
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_0
c  in DIMACS:
-16364  16365 -16366 -774 -16367 0
-16364  16365 -16366 -774 -16368 0
-16364  16365 -16366 -774 -16369 0

c  0+1 --> 1
c    (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧  p_774) -> (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0)
c  in CNF:
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_2
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_1
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨  b^{43, 19}_0
c  in DIMACS:
 16364  16365  16366 -774 -16367 0
 16364  16365  16366 -774 -16368 0
 16364  16365  16366 -774  16369 0

c  1+1 --> 2
c    (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0 ∧  p_774) -> (-b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0)
c  in CNF:
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_2
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨  b^{43, 19}_1
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ -p_774 ∨ -b^{43, 19}_0
c  in DIMACS:
 16364  16365 -16366 -774 -16367 0
 16364  16365 -16366 -774  16368 0
 16364  16365 -16366 -774 -16369 0

c  2+1 --> break 
c    (-b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧  p_774) -> break
c  in CNF:
c     b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 16364 -16365  16366 -774 1162 0


c  2-1 --> 1
c    (-b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧ -p_774) -> (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0)
c  in CNF:
c     b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_2
c     b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_1
c     b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨  b^{43, 19}_0
c  in DIMACS:
 16364 -16365  16366  774 -16367 0
 16364 -16365  16366  774 -16368 0
 16364 -16365  16366  774  16369 0

c  1-1 --> 0
c    (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0 ∧ -p_774) -> (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧ -b^{43, 19}_0)
c  in CNF:
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_2
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_1
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_0
c  in DIMACS:
 16364  16365 -16366  774 -16367 0
 16364  16365 -16366  774 -16368 0
 16364  16365 -16366  774 -16369 0

c  0-1 --> -1
c    (-b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧ -p_774) -> ( b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0)
c  in CNF:
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨  b^{43, 19}_2
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_1
c     b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨  b^{43, 19}_0
c  in DIMACS:
 16364  16365  16366  774  16367 0
 16364  16365  16366  774 -16368 0
 16364  16365  16366  774  16369 0

c  -1-1 --> -2
c    ( b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧  b^{43, 18}_0 ∧ -p_774) -> ( b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0)
c  in CNF:
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨  b^{43, 19}_2
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨  b^{43, 19}_1
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨  p_774 ∨ -b^{43, 19}_0
c  in DIMACS:
-16364  16365 -16366  774  16367 0
-16364  16365 -16366  774  16368 0
-16364  16365 -16366  774 -16369 0

c  -2-1 --> break 
c    ( b^{43, 18}_2 ∧  b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨  b^{43, 18}_0 ∨  p_774 ∨ break
c  in DIMACS:
-16364 -16365  16366  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 18}_2 ∧ -b^{43, 18}_1 ∧ -b^{43, 18}_0 ∧ true) 
c  in CNF:
c    -b^{43, 18}_2 ∨  b^{43, 18}_1 ∨  b^{43, 18}_0 ∨ false 
c  in DIMACS:
-16364  16365  16366  0

c  3 does not represent an automaton state.
c    -(-b^{43, 18}_2 ∧  b^{43, 18}_1 ∧  b^{43, 18}_0 ∧ true) 
c  in CNF:
c     b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ false 
c  in DIMACS:
 16364 -16365 -16366  0
c  -3 does not represent an automaton state.
c    -( b^{43, 18}_2 ∧  b^{43, 18}_1 ∧  b^{43, 18}_0 ∧ true) 
c  in CNF:
c    -b^{43, 18}_2 ∨ -b^{43, 18}_1 ∨ -b^{43, 18}_0 ∨ false 
c  in DIMACS:
-16364 -16365 -16366  0

c i = 19
c  -2+1 --> -1
c    ( b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧  p_817) -> ( b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0)
c  in CNF:
c    -b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨  b^{43, 20}_2
c    -b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_1
c    -b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨  b^{43, 20}_0
c  in DIMACS:
-16367 -16368  16369 -817  16370 0
-16367 -16368  16369 -817 -16371 0
-16367 -16368  16369 -817  16372 0

c  -1+1 --> 0
c    ( b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0 ∧  p_817) -> (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧ -b^{43, 20}_0)
c  in CNF:
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_2
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_1
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_0
c  in DIMACS:
-16367  16368 -16369 -817 -16370 0
-16367  16368 -16369 -817 -16371 0
-16367  16368 -16369 -817 -16372 0

c  0+1 --> 1
c    (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧  p_817) -> (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0)
c  in CNF:
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_2
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_1
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨  b^{43, 20}_0
c  in DIMACS:
 16367  16368  16369 -817 -16370 0
 16367  16368  16369 -817 -16371 0
 16367  16368  16369 -817  16372 0

c  1+1 --> 2
c    (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0 ∧  p_817) -> (-b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0)
c  in CNF:
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_2
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨  b^{43, 20}_1
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ -p_817 ∨ -b^{43, 20}_0
c  in DIMACS:
 16367  16368 -16369 -817 -16370 0
 16367  16368 -16369 -817  16371 0
 16367  16368 -16369 -817 -16372 0

c  2+1 --> break 
c    (-b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧  p_817) -> break
c  in CNF:
c     b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ -p_817 ∨ break
c  in DIMACS:
 16367 -16368  16369 -817 1162 0


c  2-1 --> 1
c    (-b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧ -p_817) -> (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0)
c  in CNF:
c     b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_2
c     b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_1
c     b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨  b^{43, 20}_0
c  in DIMACS:
 16367 -16368  16369  817 -16370 0
 16367 -16368  16369  817 -16371 0
 16367 -16368  16369  817  16372 0

c  1-1 --> 0
c    (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0 ∧ -p_817) -> (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧ -b^{43, 20}_0)
c  in CNF:
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_2
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_1
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_0
c  in DIMACS:
 16367  16368 -16369  817 -16370 0
 16367  16368 -16369  817 -16371 0
 16367  16368 -16369  817 -16372 0

c  0-1 --> -1
c    (-b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧ -p_817) -> ( b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0)
c  in CNF:
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨  b^{43, 20}_2
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_1
c     b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨  b^{43, 20}_0
c  in DIMACS:
 16367  16368  16369  817  16370 0
 16367  16368  16369  817 -16371 0
 16367  16368  16369  817  16372 0

c  -1-1 --> -2
c    ( b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧  b^{43, 19}_0 ∧ -p_817) -> ( b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0)
c  in CNF:
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨  b^{43, 20}_2
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨  b^{43, 20}_1
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨  p_817 ∨ -b^{43, 20}_0
c  in DIMACS:
-16367  16368 -16369  817  16370 0
-16367  16368 -16369  817  16371 0
-16367  16368 -16369  817 -16372 0

c  -2-1 --> break 
c    ( b^{43, 19}_2 ∧  b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧ -p_817) -> break
c  in CNF:
c    -b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨  b^{43, 19}_0 ∨  p_817 ∨ break
c  in DIMACS:
-16367 -16368  16369  817 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 19}_2 ∧ -b^{43, 19}_1 ∧ -b^{43, 19}_0 ∧ true) 
c  in CNF:
c    -b^{43, 19}_2 ∨  b^{43, 19}_1 ∨  b^{43, 19}_0 ∨ false 
c  in DIMACS:
-16367  16368  16369  0

c  3 does not represent an automaton state.
c    -(-b^{43, 19}_2 ∧  b^{43, 19}_1 ∧  b^{43, 19}_0 ∧ true) 
c  in CNF:
c     b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ false 
c  in DIMACS:
 16367 -16368 -16369  0
c  -3 does not represent an automaton state.
c    -( b^{43, 19}_2 ∧  b^{43, 19}_1 ∧  b^{43, 19}_0 ∧ true) 
c  in CNF:
c    -b^{43, 19}_2 ∨ -b^{43, 19}_1 ∨ -b^{43, 19}_0 ∨ false 
c  in DIMACS:
-16367 -16368 -16369  0

c i = 20
c  -2+1 --> -1
c    ( b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧  p_860) -> ( b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0)
c  in CNF:
c    -b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨  b^{43, 21}_2
c    -b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_1
c    -b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨  b^{43, 21}_0
c  in DIMACS:
-16370 -16371  16372 -860  16373 0
-16370 -16371  16372 -860 -16374 0
-16370 -16371  16372 -860  16375 0

c  -1+1 --> 0
c    ( b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0 ∧  p_860) -> (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧ -b^{43, 21}_0)
c  in CNF:
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_2
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_1
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_0
c  in DIMACS:
-16370  16371 -16372 -860 -16373 0
-16370  16371 -16372 -860 -16374 0
-16370  16371 -16372 -860 -16375 0

c  0+1 --> 1
c    (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧  p_860) -> (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0)
c  in CNF:
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_2
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_1
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨  b^{43, 21}_0
c  in DIMACS:
 16370  16371  16372 -860 -16373 0
 16370  16371  16372 -860 -16374 0
 16370  16371  16372 -860  16375 0

c  1+1 --> 2
c    (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0 ∧  p_860) -> (-b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0)
c  in CNF:
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_2
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨  b^{43, 21}_1
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ -p_860 ∨ -b^{43, 21}_0
c  in DIMACS:
 16370  16371 -16372 -860 -16373 0
 16370  16371 -16372 -860  16374 0
 16370  16371 -16372 -860 -16375 0

c  2+1 --> break 
c    (-b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧  p_860) -> break
c  in CNF:
c     b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 16370 -16371  16372 -860 1162 0


c  2-1 --> 1
c    (-b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧ -p_860) -> (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0)
c  in CNF:
c     b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_2
c     b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_1
c     b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨  b^{43, 21}_0
c  in DIMACS:
 16370 -16371  16372  860 -16373 0
 16370 -16371  16372  860 -16374 0
 16370 -16371  16372  860  16375 0

c  1-1 --> 0
c    (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0 ∧ -p_860) -> (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧ -b^{43, 21}_0)
c  in CNF:
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_2
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_1
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_0
c  in DIMACS:
 16370  16371 -16372  860 -16373 0
 16370  16371 -16372  860 -16374 0
 16370  16371 -16372  860 -16375 0

c  0-1 --> -1
c    (-b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧ -p_860) -> ( b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0)
c  in CNF:
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨  b^{43, 21}_2
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_1
c     b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨  b^{43, 21}_0
c  in DIMACS:
 16370  16371  16372  860  16373 0
 16370  16371  16372  860 -16374 0
 16370  16371  16372  860  16375 0

c  -1-1 --> -2
c    ( b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧  b^{43, 20}_0 ∧ -p_860) -> ( b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0)
c  in CNF:
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨  b^{43, 21}_2
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨  b^{43, 21}_1
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨  p_860 ∨ -b^{43, 21}_0
c  in DIMACS:
-16370  16371 -16372  860  16373 0
-16370  16371 -16372  860  16374 0
-16370  16371 -16372  860 -16375 0

c  -2-1 --> break 
c    ( b^{43, 20}_2 ∧  b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨  b^{43, 20}_0 ∨  p_860 ∨ break
c  in DIMACS:
-16370 -16371  16372  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 20}_2 ∧ -b^{43, 20}_1 ∧ -b^{43, 20}_0 ∧ true) 
c  in CNF:
c    -b^{43, 20}_2 ∨  b^{43, 20}_1 ∨  b^{43, 20}_0 ∨ false 
c  in DIMACS:
-16370  16371  16372  0

c  3 does not represent an automaton state.
c    -(-b^{43, 20}_2 ∧  b^{43, 20}_1 ∧  b^{43, 20}_0 ∧ true) 
c  in CNF:
c     b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ false 
c  in DIMACS:
 16370 -16371 -16372  0
c  -3 does not represent an automaton state.
c    -( b^{43, 20}_2 ∧  b^{43, 20}_1 ∧  b^{43, 20}_0 ∧ true) 
c  in CNF:
c    -b^{43, 20}_2 ∨ -b^{43, 20}_1 ∨ -b^{43, 20}_0 ∨ false 
c  in DIMACS:
-16370 -16371 -16372  0

c i = 21
c  -2+1 --> -1
c    ( b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧  p_903) -> ( b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0)
c  in CNF:
c    -b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨  b^{43, 22}_2
c    -b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_1
c    -b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨  b^{43, 22}_0
c  in DIMACS:
-16373 -16374  16375 -903  16376 0
-16373 -16374  16375 -903 -16377 0
-16373 -16374  16375 -903  16378 0

c  -1+1 --> 0
c    ( b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0 ∧  p_903) -> (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧ -b^{43, 22}_0)
c  in CNF:
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_2
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_1
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_0
c  in DIMACS:
-16373  16374 -16375 -903 -16376 0
-16373  16374 -16375 -903 -16377 0
-16373  16374 -16375 -903 -16378 0

c  0+1 --> 1
c    (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧  p_903) -> (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0)
c  in CNF:
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_2
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_1
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨  b^{43, 22}_0
c  in DIMACS:
 16373  16374  16375 -903 -16376 0
 16373  16374  16375 -903 -16377 0
 16373  16374  16375 -903  16378 0

c  1+1 --> 2
c    (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0 ∧  p_903) -> (-b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0)
c  in CNF:
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_2
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨  b^{43, 22}_1
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ -p_903 ∨ -b^{43, 22}_0
c  in DIMACS:
 16373  16374 -16375 -903 -16376 0
 16373  16374 -16375 -903  16377 0
 16373  16374 -16375 -903 -16378 0

c  2+1 --> break 
c    (-b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧  p_903) -> break
c  in CNF:
c     b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 16373 -16374  16375 -903 1162 0


c  2-1 --> 1
c    (-b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧ -p_903) -> (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0)
c  in CNF:
c     b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_2
c     b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_1
c     b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨  b^{43, 22}_0
c  in DIMACS:
 16373 -16374  16375  903 -16376 0
 16373 -16374  16375  903 -16377 0
 16373 -16374  16375  903  16378 0

c  1-1 --> 0
c    (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0 ∧ -p_903) -> (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧ -b^{43, 22}_0)
c  in CNF:
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_2
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_1
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_0
c  in DIMACS:
 16373  16374 -16375  903 -16376 0
 16373  16374 -16375  903 -16377 0
 16373  16374 -16375  903 -16378 0

c  0-1 --> -1
c    (-b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧ -p_903) -> ( b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0)
c  in CNF:
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨  b^{43, 22}_2
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_1
c     b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨  b^{43, 22}_0
c  in DIMACS:
 16373  16374  16375  903  16376 0
 16373  16374  16375  903 -16377 0
 16373  16374  16375  903  16378 0

c  -1-1 --> -2
c    ( b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧  b^{43, 21}_0 ∧ -p_903) -> ( b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0)
c  in CNF:
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨  b^{43, 22}_2
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨  b^{43, 22}_1
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨  p_903 ∨ -b^{43, 22}_0
c  in DIMACS:
-16373  16374 -16375  903  16376 0
-16373  16374 -16375  903  16377 0
-16373  16374 -16375  903 -16378 0

c  -2-1 --> break 
c    ( b^{43, 21}_2 ∧  b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨  b^{43, 21}_0 ∨  p_903 ∨ break
c  in DIMACS:
-16373 -16374  16375  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 21}_2 ∧ -b^{43, 21}_1 ∧ -b^{43, 21}_0 ∧ true) 
c  in CNF:
c    -b^{43, 21}_2 ∨  b^{43, 21}_1 ∨  b^{43, 21}_0 ∨ false 
c  in DIMACS:
-16373  16374  16375  0

c  3 does not represent an automaton state.
c    -(-b^{43, 21}_2 ∧  b^{43, 21}_1 ∧  b^{43, 21}_0 ∧ true) 
c  in CNF:
c     b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ false 
c  in DIMACS:
 16373 -16374 -16375  0
c  -3 does not represent an automaton state.
c    -( b^{43, 21}_2 ∧  b^{43, 21}_1 ∧  b^{43, 21}_0 ∧ true) 
c  in CNF:
c    -b^{43, 21}_2 ∨ -b^{43, 21}_1 ∨ -b^{43, 21}_0 ∨ false 
c  in DIMACS:
-16373 -16374 -16375  0

c i = 22
c  -2+1 --> -1
c    ( b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧  p_946) -> ( b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0)
c  in CNF:
c    -b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨  b^{43, 23}_2
c    -b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_1
c    -b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨  b^{43, 23}_0
c  in DIMACS:
-16376 -16377  16378 -946  16379 0
-16376 -16377  16378 -946 -16380 0
-16376 -16377  16378 -946  16381 0

c  -1+1 --> 0
c    ( b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0 ∧  p_946) -> (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧ -b^{43, 23}_0)
c  in CNF:
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_2
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_1
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_0
c  in DIMACS:
-16376  16377 -16378 -946 -16379 0
-16376  16377 -16378 -946 -16380 0
-16376  16377 -16378 -946 -16381 0

c  0+1 --> 1
c    (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧  p_946) -> (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0)
c  in CNF:
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_2
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_1
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨  b^{43, 23}_0
c  in DIMACS:
 16376  16377  16378 -946 -16379 0
 16376  16377  16378 -946 -16380 0
 16376  16377  16378 -946  16381 0

c  1+1 --> 2
c    (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0 ∧  p_946) -> (-b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0)
c  in CNF:
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_2
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨  b^{43, 23}_1
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ -p_946 ∨ -b^{43, 23}_0
c  in DIMACS:
 16376  16377 -16378 -946 -16379 0
 16376  16377 -16378 -946  16380 0
 16376  16377 -16378 -946 -16381 0

c  2+1 --> break 
c    (-b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧  p_946) -> break
c  in CNF:
c     b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 16376 -16377  16378 -946 1162 0


c  2-1 --> 1
c    (-b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧ -p_946) -> (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0)
c  in CNF:
c     b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_2
c     b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_1
c     b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨  b^{43, 23}_0
c  in DIMACS:
 16376 -16377  16378  946 -16379 0
 16376 -16377  16378  946 -16380 0
 16376 -16377  16378  946  16381 0

c  1-1 --> 0
c    (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0 ∧ -p_946) -> (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧ -b^{43, 23}_0)
c  in CNF:
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_2
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_1
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_0
c  in DIMACS:
 16376  16377 -16378  946 -16379 0
 16376  16377 -16378  946 -16380 0
 16376  16377 -16378  946 -16381 0

c  0-1 --> -1
c    (-b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧ -p_946) -> ( b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0)
c  in CNF:
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨  b^{43, 23}_2
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_1
c     b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨  b^{43, 23}_0
c  in DIMACS:
 16376  16377  16378  946  16379 0
 16376  16377  16378  946 -16380 0
 16376  16377  16378  946  16381 0

c  -1-1 --> -2
c    ( b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧  b^{43, 22}_0 ∧ -p_946) -> ( b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0)
c  in CNF:
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨  b^{43, 23}_2
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨  b^{43, 23}_1
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨  p_946 ∨ -b^{43, 23}_0
c  in DIMACS:
-16376  16377 -16378  946  16379 0
-16376  16377 -16378  946  16380 0
-16376  16377 -16378  946 -16381 0

c  -2-1 --> break 
c    ( b^{43, 22}_2 ∧  b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨  b^{43, 22}_0 ∨  p_946 ∨ break
c  in DIMACS:
-16376 -16377  16378  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 22}_2 ∧ -b^{43, 22}_1 ∧ -b^{43, 22}_0 ∧ true) 
c  in CNF:
c    -b^{43, 22}_2 ∨  b^{43, 22}_1 ∨  b^{43, 22}_0 ∨ false 
c  in DIMACS:
-16376  16377  16378  0

c  3 does not represent an automaton state.
c    -(-b^{43, 22}_2 ∧  b^{43, 22}_1 ∧  b^{43, 22}_0 ∧ true) 
c  in CNF:
c     b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ false 
c  in DIMACS:
 16376 -16377 -16378  0
c  -3 does not represent an automaton state.
c    -( b^{43, 22}_2 ∧  b^{43, 22}_1 ∧  b^{43, 22}_0 ∧ true) 
c  in CNF:
c    -b^{43, 22}_2 ∨ -b^{43, 22}_1 ∨ -b^{43, 22}_0 ∨ false 
c  in DIMACS:
-16376 -16377 -16378  0

c i = 23
c  -2+1 --> -1
c    ( b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧  p_989) -> ( b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0)
c  in CNF:
c    -b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨  b^{43, 24}_2
c    -b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_1
c    -b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨  b^{43, 24}_0
c  in DIMACS:
-16379 -16380  16381 -989  16382 0
-16379 -16380  16381 -989 -16383 0
-16379 -16380  16381 -989  16384 0

c  -1+1 --> 0
c    ( b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0 ∧  p_989) -> (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧ -b^{43, 24}_0)
c  in CNF:
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_2
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_1
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_0
c  in DIMACS:
-16379  16380 -16381 -989 -16382 0
-16379  16380 -16381 -989 -16383 0
-16379  16380 -16381 -989 -16384 0

c  0+1 --> 1
c    (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧  p_989) -> (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0)
c  in CNF:
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_2
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_1
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨  b^{43, 24}_0
c  in DIMACS:
 16379  16380  16381 -989 -16382 0
 16379  16380  16381 -989 -16383 0
 16379  16380  16381 -989  16384 0

c  1+1 --> 2
c    (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0 ∧  p_989) -> (-b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0)
c  in CNF:
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_2
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨  b^{43, 24}_1
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ -p_989 ∨ -b^{43, 24}_0
c  in DIMACS:
 16379  16380 -16381 -989 -16382 0
 16379  16380 -16381 -989  16383 0
 16379  16380 -16381 -989 -16384 0

c  2+1 --> break 
c    (-b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧  p_989) -> break
c  in CNF:
c     b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ -p_989 ∨ break
c  in DIMACS:
 16379 -16380  16381 -989 1162 0


c  2-1 --> 1
c    (-b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧ -p_989) -> (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0)
c  in CNF:
c     b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_2
c     b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_1
c     b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨  b^{43, 24}_0
c  in DIMACS:
 16379 -16380  16381  989 -16382 0
 16379 -16380  16381  989 -16383 0
 16379 -16380  16381  989  16384 0

c  1-1 --> 0
c    (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0 ∧ -p_989) -> (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧ -b^{43, 24}_0)
c  in CNF:
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_2
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_1
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_0
c  in DIMACS:
 16379  16380 -16381  989 -16382 0
 16379  16380 -16381  989 -16383 0
 16379  16380 -16381  989 -16384 0

c  0-1 --> -1
c    (-b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧ -p_989) -> ( b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0)
c  in CNF:
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨  b^{43, 24}_2
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_1
c     b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨  b^{43, 24}_0
c  in DIMACS:
 16379  16380  16381  989  16382 0
 16379  16380  16381  989 -16383 0
 16379  16380  16381  989  16384 0

c  -1-1 --> -2
c    ( b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧  b^{43, 23}_0 ∧ -p_989) -> ( b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0)
c  in CNF:
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨  b^{43, 24}_2
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨  b^{43, 24}_1
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨  p_989 ∨ -b^{43, 24}_0
c  in DIMACS:
-16379  16380 -16381  989  16382 0
-16379  16380 -16381  989  16383 0
-16379  16380 -16381  989 -16384 0

c  -2-1 --> break 
c    ( b^{43, 23}_2 ∧  b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧ -p_989) -> break
c  in CNF:
c    -b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨  b^{43, 23}_0 ∨  p_989 ∨ break
c  in DIMACS:
-16379 -16380  16381  989 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 23}_2 ∧ -b^{43, 23}_1 ∧ -b^{43, 23}_0 ∧ true) 
c  in CNF:
c    -b^{43, 23}_2 ∨  b^{43, 23}_1 ∨  b^{43, 23}_0 ∨ false 
c  in DIMACS:
-16379  16380  16381  0

c  3 does not represent an automaton state.
c    -(-b^{43, 23}_2 ∧  b^{43, 23}_1 ∧  b^{43, 23}_0 ∧ true) 
c  in CNF:
c     b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ false 
c  in DIMACS:
 16379 -16380 -16381  0
c  -3 does not represent an automaton state.
c    -( b^{43, 23}_2 ∧  b^{43, 23}_1 ∧  b^{43, 23}_0 ∧ true) 
c  in CNF:
c    -b^{43, 23}_2 ∨ -b^{43, 23}_1 ∨ -b^{43, 23}_0 ∨ false 
c  in DIMACS:
-16379 -16380 -16381  0

c i = 24
c  -2+1 --> -1
c    ( b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧  p_1032) -> ( b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0)
c  in CNF:
c    -b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨  b^{43, 25}_2
c    -b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_1
c    -b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨  b^{43, 25}_0
c  in DIMACS:
-16382 -16383  16384 -1032  16385 0
-16382 -16383  16384 -1032 -16386 0
-16382 -16383  16384 -1032  16387 0

c  -1+1 --> 0
c    ( b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0 ∧  p_1032) -> (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧ -b^{43, 25}_0)
c  in CNF:
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_2
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_1
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_0
c  in DIMACS:
-16382  16383 -16384 -1032 -16385 0
-16382  16383 -16384 -1032 -16386 0
-16382  16383 -16384 -1032 -16387 0

c  0+1 --> 1
c    (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧  p_1032) -> (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0)
c  in CNF:
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_2
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_1
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨  b^{43, 25}_0
c  in DIMACS:
 16382  16383  16384 -1032 -16385 0
 16382  16383  16384 -1032 -16386 0
 16382  16383  16384 -1032  16387 0

c  1+1 --> 2
c    (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0 ∧  p_1032) -> (-b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0)
c  in CNF:
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_2
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨  b^{43, 25}_1
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ -p_1032 ∨ -b^{43, 25}_0
c  in DIMACS:
 16382  16383 -16384 -1032 -16385 0
 16382  16383 -16384 -1032  16386 0
 16382  16383 -16384 -1032 -16387 0

c  2+1 --> break 
c    (-b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 16382 -16383  16384 -1032 1162 0


c  2-1 --> 1
c    (-b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧ -p_1032) -> (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0)
c  in CNF:
c     b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_2
c     b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_1
c     b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨  b^{43, 25}_0
c  in DIMACS:
 16382 -16383  16384  1032 -16385 0
 16382 -16383  16384  1032 -16386 0
 16382 -16383  16384  1032  16387 0

c  1-1 --> 0
c    (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0 ∧ -p_1032) -> (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧ -b^{43, 25}_0)
c  in CNF:
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_2
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_1
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_0
c  in DIMACS:
 16382  16383 -16384  1032 -16385 0
 16382  16383 -16384  1032 -16386 0
 16382  16383 -16384  1032 -16387 0

c  0-1 --> -1
c    (-b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧ -p_1032) -> ( b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0)
c  in CNF:
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨  b^{43, 25}_2
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_1
c     b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨  b^{43, 25}_0
c  in DIMACS:
 16382  16383  16384  1032  16385 0
 16382  16383  16384  1032 -16386 0
 16382  16383  16384  1032  16387 0

c  -1-1 --> -2
c    ( b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧  b^{43, 24}_0 ∧ -p_1032) -> ( b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0)
c  in CNF:
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨  b^{43, 25}_2
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨  b^{43, 25}_1
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨  p_1032 ∨ -b^{43, 25}_0
c  in DIMACS:
-16382  16383 -16384  1032  16385 0
-16382  16383 -16384  1032  16386 0
-16382  16383 -16384  1032 -16387 0

c  -2-1 --> break 
c    ( b^{43, 24}_2 ∧  b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨  b^{43, 24}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-16382 -16383  16384  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 24}_2 ∧ -b^{43, 24}_1 ∧ -b^{43, 24}_0 ∧ true) 
c  in CNF:
c    -b^{43, 24}_2 ∨  b^{43, 24}_1 ∨  b^{43, 24}_0 ∨ false 
c  in DIMACS:
-16382  16383  16384  0

c  3 does not represent an automaton state.
c    -(-b^{43, 24}_2 ∧  b^{43, 24}_1 ∧  b^{43, 24}_0 ∧ true) 
c  in CNF:
c     b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ false 
c  in DIMACS:
 16382 -16383 -16384  0
c  -3 does not represent an automaton state.
c    -( b^{43, 24}_2 ∧  b^{43, 24}_1 ∧  b^{43, 24}_0 ∧ true) 
c  in CNF:
c    -b^{43, 24}_2 ∨ -b^{43, 24}_1 ∨ -b^{43, 24}_0 ∨ false 
c  in DIMACS:
-16382 -16383 -16384  0

c i = 25
c  -2+1 --> -1
c    ( b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧  p_1075) -> ( b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0)
c  in CNF:
c    -b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨  b^{43, 26}_2
c    -b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_1
c    -b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨  b^{43, 26}_0
c  in DIMACS:
-16385 -16386  16387 -1075  16388 0
-16385 -16386  16387 -1075 -16389 0
-16385 -16386  16387 -1075  16390 0

c  -1+1 --> 0
c    ( b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0 ∧  p_1075) -> (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧ -b^{43, 26}_0)
c  in CNF:
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_2
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_1
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_0
c  in DIMACS:
-16385  16386 -16387 -1075 -16388 0
-16385  16386 -16387 -1075 -16389 0
-16385  16386 -16387 -1075 -16390 0

c  0+1 --> 1
c    (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧  p_1075) -> (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0)
c  in CNF:
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_2
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_1
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨  b^{43, 26}_0
c  in DIMACS:
 16385  16386  16387 -1075 -16388 0
 16385  16386  16387 -1075 -16389 0
 16385  16386  16387 -1075  16390 0

c  1+1 --> 2
c    (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0 ∧  p_1075) -> (-b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0)
c  in CNF:
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_2
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨  b^{43, 26}_1
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ -p_1075 ∨ -b^{43, 26}_0
c  in DIMACS:
 16385  16386 -16387 -1075 -16388 0
 16385  16386 -16387 -1075  16389 0
 16385  16386 -16387 -1075 -16390 0

c  2+1 --> break 
c    (-b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧  p_1075) -> break
c  in CNF:
c     b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ -p_1075 ∨ break
c  in DIMACS:
 16385 -16386  16387 -1075 1162 0


c  2-1 --> 1
c    (-b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧ -p_1075) -> (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0)
c  in CNF:
c     b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_2
c     b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_1
c     b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨  b^{43, 26}_0
c  in DIMACS:
 16385 -16386  16387  1075 -16388 0
 16385 -16386  16387  1075 -16389 0
 16385 -16386  16387  1075  16390 0

c  1-1 --> 0
c    (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0 ∧ -p_1075) -> (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧ -b^{43, 26}_0)
c  in CNF:
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_2
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_1
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_0
c  in DIMACS:
 16385  16386 -16387  1075 -16388 0
 16385  16386 -16387  1075 -16389 0
 16385  16386 -16387  1075 -16390 0

c  0-1 --> -1
c    (-b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧ -p_1075) -> ( b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0)
c  in CNF:
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨  b^{43, 26}_2
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_1
c     b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨  b^{43, 26}_0
c  in DIMACS:
 16385  16386  16387  1075  16388 0
 16385  16386  16387  1075 -16389 0
 16385  16386  16387  1075  16390 0

c  -1-1 --> -2
c    ( b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧  b^{43, 25}_0 ∧ -p_1075) -> ( b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0)
c  in CNF:
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨  b^{43, 26}_2
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨  b^{43, 26}_1
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨  p_1075 ∨ -b^{43, 26}_0
c  in DIMACS:
-16385  16386 -16387  1075  16388 0
-16385  16386 -16387  1075  16389 0
-16385  16386 -16387  1075 -16390 0

c  -2-1 --> break 
c    ( b^{43, 25}_2 ∧  b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧ -p_1075) -> break
c  in CNF:
c    -b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨  b^{43, 25}_0 ∨  p_1075 ∨ break
c  in DIMACS:
-16385 -16386  16387  1075 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 25}_2 ∧ -b^{43, 25}_1 ∧ -b^{43, 25}_0 ∧ true) 
c  in CNF:
c    -b^{43, 25}_2 ∨  b^{43, 25}_1 ∨  b^{43, 25}_0 ∨ false 
c  in DIMACS:
-16385  16386  16387  0

c  3 does not represent an automaton state.
c    -(-b^{43, 25}_2 ∧  b^{43, 25}_1 ∧  b^{43, 25}_0 ∧ true) 
c  in CNF:
c     b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ false 
c  in DIMACS:
 16385 -16386 -16387  0
c  -3 does not represent an automaton state.
c    -( b^{43, 25}_2 ∧  b^{43, 25}_1 ∧  b^{43, 25}_0 ∧ true) 
c  in CNF:
c    -b^{43, 25}_2 ∨ -b^{43, 25}_1 ∨ -b^{43, 25}_0 ∨ false 
c  in DIMACS:
-16385 -16386 -16387  0

c i = 26
c  -2+1 --> -1
c    ( b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧  p_1118) -> ( b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0)
c  in CNF:
c    -b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨  b^{43, 27}_2
c    -b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_1
c    -b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨  b^{43, 27}_0
c  in DIMACS:
-16388 -16389  16390 -1118  16391 0
-16388 -16389  16390 -1118 -16392 0
-16388 -16389  16390 -1118  16393 0

c  -1+1 --> 0
c    ( b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0 ∧  p_1118) -> (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧ -b^{43, 27}_0)
c  in CNF:
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_2
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_1
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_0
c  in DIMACS:
-16388  16389 -16390 -1118 -16391 0
-16388  16389 -16390 -1118 -16392 0
-16388  16389 -16390 -1118 -16393 0

c  0+1 --> 1
c    (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧  p_1118) -> (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0)
c  in CNF:
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_2
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_1
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨  b^{43, 27}_0
c  in DIMACS:
 16388  16389  16390 -1118 -16391 0
 16388  16389  16390 -1118 -16392 0
 16388  16389  16390 -1118  16393 0

c  1+1 --> 2
c    (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0 ∧  p_1118) -> (-b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0)
c  in CNF:
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_2
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨  b^{43, 27}_1
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ -p_1118 ∨ -b^{43, 27}_0
c  in DIMACS:
 16388  16389 -16390 -1118 -16391 0
 16388  16389 -16390 -1118  16392 0
 16388  16389 -16390 -1118 -16393 0

c  2+1 --> break 
c    (-b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 16388 -16389  16390 -1118 1162 0


c  2-1 --> 1
c    (-b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧ -p_1118) -> (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0)
c  in CNF:
c     b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_2
c     b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_1
c     b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨  b^{43, 27}_0
c  in DIMACS:
 16388 -16389  16390  1118 -16391 0
 16388 -16389  16390  1118 -16392 0
 16388 -16389  16390  1118  16393 0

c  1-1 --> 0
c    (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0 ∧ -p_1118) -> (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧ -b^{43, 27}_0)
c  in CNF:
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_2
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_1
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_0
c  in DIMACS:
 16388  16389 -16390  1118 -16391 0
 16388  16389 -16390  1118 -16392 0
 16388  16389 -16390  1118 -16393 0

c  0-1 --> -1
c    (-b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧ -p_1118) -> ( b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0)
c  in CNF:
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨  b^{43, 27}_2
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_1
c     b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨  b^{43, 27}_0
c  in DIMACS:
 16388  16389  16390  1118  16391 0
 16388  16389  16390  1118 -16392 0
 16388  16389  16390  1118  16393 0

c  -1-1 --> -2
c    ( b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧  b^{43, 26}_0 ∧ -p_1118) -> ( b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0)
c  in CNF:
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨  b^{43, 27}_2
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨  b^{43, 27}_1
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨  p_1118 ∨ -b^{43, 27}_0
c  in DIMACS:
-16388  16389 -16390  1118  16391 0
-16388  16389 -16390  1118  16392 0
-16388  16389 -16390  1118 -16393 0

c  -2-1 --> break 
c    ( b^{43, 26}_2 ∧  b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨  b^{43, 26}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-16388 -16389  16390  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 26}_2 ∧ -b^{43, 26}_1 ∧ -b^{43, 26}_0 ∧ true) 
c  in CNF:
c    -b^{43, 26}_2 ∨  b^{43, 26}_1 ∨  b^{43, 26}_0 ∨ false 
c  in DIMACS:
-16388  16389  16390  0

c  3 does not represent an automaton state.
c    -(-b^{43, 26}_2 ∧  b^{43, 26}_1 ∧  b^{43, 26}_0 ∧ true) 
c  in CNF:
c     b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ false 
c  in DIMACS:
 16388 -16389 -16390  0
c  -3 does not represent an automaton state.
c    -( b^{43, 26}_2 ∧  b^{43, 26}_1 ∧  b^{43, 26}_0 ∧ true) 
c  in CNF:
c    -b^{43, 26}_2 ∨ -b^{43, 26}_1 ∨ -b^{43, 26}_0 ∨ false 
c  in DIMACS:
-16388 -16389 -16390  0

c i = 27
c  -2+1 --> -1
c    ( b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧  p_1161) -> ( b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧  b^{43, 28}_0)
c  in CNF:
c    -b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨  b^{43, 28}_2
c    -b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_1
c    -b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨  b^{43, 28}_0
c  in DIMACS:
-16391 -16392  16393 -1161  16394 0
-16391 -16392  16393 -1161 -16395 0
-16391 -16392  16393 -1161  16396 0

c  -1+1 --> 0
c    ( b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0 ∧  p_1161) -> (-b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧ -b^{43, 28}_0)
c  in CNF:
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_2
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_1
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_0
c  in DIMACS:
-16391  16392 -16393 -1161 -16394 0
-16391  16392 -16393 -1161 -16395 0
-16391  16392 -16393 -1161 -16396 0

c  0+1 --> 1
c    (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧  p_1161) -> (-b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧  b^{43, 28}_0)
c  in CNF:
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_2
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_1
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨  b^{43, 28}_0
c  in DIMACS:
 16391  16392  16393 -1161 -16394 0
 16391  16392  16393 -1161 -16395 0
 16391  16392  16393 -1161  16396 0

c  1+1 --> 2
c    (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0 ∧  p_1161) -> (-b^{43, 28}_2 ∧  b^{43, 28}_1 ∧ -b^{43, 28}_0)
c  in CNF:
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_2
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨  b^{43, 28}_1
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ -p_1161 ∨ -b^{43, 28}_0
c  in DIMACS:
 16391  16392 -16393 -1161 -16394 0
 16391  16392 -16393 -1161  16395 0
 16391  16392 -16393 -1161 -16396 0

c  2+1 --> break 
c    (-b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 16391 -16392  16393 -1161 1162 0


c  2-1 --> 1
c    (-b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧ -p_1161) -> (-b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧  b^{43, 28}_0)
c  in CNF:
c     b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_2
c     b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_1
c     b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨  b^{43, 28}_0
c  in DIMACS:
 16391 -16392  16393  1161 -16394 0
 16391 -16392  16393  1161 -16395 0
 16391 -16392  16393  1161  16396 0

c  1-1 --> 0
c    (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0 ∧ -p_1161) -> (-b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧ -b^{43, 28}_0)
c  in CNF:
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_2
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_1
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_0
c  in DIMACS:
 16391  16392 -16393  1161 -16394 0
 16391  16392 -16393  1161 -16395 0
 16391  16392 -16393  1161 -16396 0

c  0-1 --> -1
c    (-b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧ -p_1161) -> ( b^{43, 28}_2 ∧ -b^{43, 28}_1 ∧  b^{43, 28}_0)
c  in CNF:
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨  b^{43, 28}_2
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_1
c     b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨  b^{43, 28}_0
c  in DIMACS:
 16391  16392  16393  1161  16394 0
 16391  16392  16393  1161 -16395 0
 16391  16392  16393  1161  16396 0

c  -1-1 --> -2
c    ( b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧  b^{43, 27}_0 ∧ -p_1161) -> ( b^{43, 28}_2 ∧  b^{43, 28}_1 ∧ -b^{43, 28}_0)
c  in CNF:
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨  b^{43, 28}_2
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨  b^{43, 28}_1
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨  p_1161 ∨ -b^{43, 28}_0
c  in DIMACS:
-16391  16392 -16393  1161  16394 0
-16391  16392 -16393  1161  16395 0
-16391  16392 -16393  1161 -16396 0

c  -2-1 --> break 
c    ( b^{43, 27}_2 ∧  b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨  b^{43, 27}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-16391 -16392  16393  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{43, 27}_2 ∧ -b^{43, 27}_1 ∧ -b^{43, 27}_0 ∧ true) 
c  in CNF:
c    -b^{43, 27}_2 ∨  b^{43, 27}_1 ∨  b^{43, 27}_0 ∨ false 
c  in DIMACS:
-16391  16392  16393  0

c  3 does not represent an automaton state.
c    -(-b^{43, 27}_2 ∧  b^{43, 27}_1 ∧  b^{43, 27}_0 ∧ true) 
c  in CNF:
c     b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ false 
c  in DIMACS:
 16391 -16392 -16393  0
c  -3 does not represent an automaton state.
c    -( b^{43, 27}_2 ∧  b^{43, 27}_1 ∧  b^{43, 27}_0 ∧ true) 
c  in CNF:
c    -b^{43, 27}_2 ∨ -b^{43, 27}_1 ∨ -b^{43, 27}_0 ∨ false 
c  in DIMACS:
-16391 -16392 -16393  0

c INIT for k = 44
c    -b^{44, 1}_2
c    -b^{44, 1}_1
c    -b^{44, 1}_0
c  in DIMACS:
-16397 0
-16398 0
-16399 0

c Transitions for k = 44
c i = 1
c  -2+1 --> -1
c    ( b^{44, 1}_2 ∧  b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧  p_44) -> ( b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0)
c  in CNF:
c    -b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨  b^{44, 2}_2
c    -b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_1
c    -b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨  b^{44, 2}_0
c  in DIMACS:
-16397 -16398  16399 -44  16400 0
-16397 -16398  16399 -44 -16401 0
-16397 -16398  16399 -44  16402 0

c  -1+1 --> 0
c    ( b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧  b^{44, 1}_0 ∧  p_44) -> (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧ -b^{44, 2}_0)
c  in CNF:
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_2
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_1
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_0
c  in DIMACS:
-16397  16398 -16399 -44 -16400 0
-16397  16398 -16399 -44 -16401 0
-16397  16398 -16399 -44 -16402 0

c  0+1 --> 1
c    (-b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧  p_44) -> (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0)
c  in CNF:
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_2
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_1
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨  b^{44, 2}_0
c  in DIMACS:
 16397  16398  16399 -44 -16400 0
 16397  16398  16399 -44 -16401 0
 16397  16398  16399 -44  16402 0

c  1+1 --> 2
c    (-b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧  b^{44, 1}_0 ∧  p_44) -> (-b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0)
c  in CNF:
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_2
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨  b^{44, 2}_1
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ -p_44 ∨ -b^{44, 2}_0
c  in DIMACS:
 16397  16398 -16399 -44 -16400 0
 16397  16398 -16399 -44  16401 0
 16397  16398 -16399 -44 -16402 0

c  2+1 --> break 
c    (-b^{44, 1}_2 ∧  b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧  p_44) -> break
c  in CNF:
c     b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ -p_44 ∨ break
c  in DIMACS:
 16397 -16398  16399 -44 1162 0


c  2-1 --> 1
c    (-b^{44, 1}_2 ∧  b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧ -p_44) -> (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0)
c  in CNF:
c     b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_2
c     b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_1
c     b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨  b^{44, 2}_0
c  in DIMACS:
 16397 -16398  16399  44 -16400 0
 16397 -16398  16399  44 -16401 0
 16397 -16398  16399  44  16402 0

c  1-1 --> 0
c    (-b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧  b^{44, 1}_0 ∧ -p_44) -> (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧ -b^{44, 2}_0)
c  in CNF:
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_2
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_1
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_0
c  in DIMACS:
 16397  16398 -16399  44 -16400 0
 16397  16398 -16399  44 -16401 0
 16397  16398 -16399  44 -16402 0

c  0-1 --> -1
c    (-b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧ -p_44) -> ( b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0)
c  in CNF:
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨  b^{44, 2}_2
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_1
c     b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨  b^{44, 2}_0
c  in DIMACS:
 16397  16398  16399  44  16400 0
 16397  16398  16399  44 -16401 0
 16397  16398  16399  44  16402 0

c  -1-1 --> -2
c    ( b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧  b^{44, 1}_0 ∧ -p_44) -> ( b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0)
c  in CNF:
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨  b^{44, 2}_2
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨  b^{44, 2}_1
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨  p_44 ∨ -b^{44, 2}_0
c  in DIMACS:
-16397  16398 -16399  44  16400 0
-16397  16398 -16399  44  16401 0
-16397  16398 -16399  44 -16402 0

c  -2-1 --> break 
c    ( b^{44, 1}_2 ∧  b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧ -p_44) -> break
c  in CNF:
c    -b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨  b^{44, 1}_0 ∨  p_44 ∨ break
c  in DIMACS:
-16397 -16398  16399  44 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 1}_2 ∧ -b^{44, 1}_1 ∧ -b^{44, 1}_0 ∧ true) 
c  in CNF:
c    -b^{44, 1}_2 ∨  b^{44, 1}_1 ∨  b^{44, 1}_0 ∨ false 
c  in DIMACS:
-16397  16398  16399  0

c  3 does not represent an automaton state.
c    -(-b^{44, 1}_2 ∧  b^{44, 1}_1 ∧  b^{44, 1}_0 ∧ true) 
c  in CNF:
c     b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ false 
c  in DIMACS:
 16397 -16398 -16399  0
c  -3 does not represent an automaton state.
c    -( b^{44, 1}_2 ∧  b^{44, 1}_1 ∧  b^{44, 1}_0 ∧ true) 
c  in CNF:
c    -b^{44, 1}_2 ∨ -b^{44, 1}_1 ∨ -b^{44, 1}_0 ∨ false 
c  in DIMACS:
-16397 -16398 -16399  0

c i = 2
c  -2+1 --> -1
c    ( b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧  p_88) -> ( b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0)
c  in CNF:
c    -b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨  b^{44, 3}_2
c    -b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_1
c    -b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨  b^{44, 3}_0
c  in DIMACS:
-16400 -16401  16402 -88  16403 0
-16400 -16401  16402 -88 -16404 0
-16400 -16401  16402 -88  16405 0

c  -1+1 --> 0
c    ( b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0 ∧  p_88) -> (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧ -b^{44, 3}_0)
c  in CNF:
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_2
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_1
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_0
c  in DIMACS:
-16400  16401 -16402 -88 -16403 0
-16400  16401 -16402 -88 -16404 0
-16400  16401 -16402 -88 -16405 0

c  0+1 --> 1
c    (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧  p_88) -> (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0)
c  in CNF:
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_2
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_1
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨  b^{44, 3}_0
c  in DIMACS:
 16400  16401  16402 -88 -16403 0
 16400  16401  16402 -88 -16404 0
 16400  16401  16402 -88  16405 0

c  1+1 --> 2
c    (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0 ∧  p_88) -> (-b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0)
c  in CNF:
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_2
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨  b^{44, 3}_1
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ -p_88 ∨ -b^{44, 3}_0
c  in DIMACS:
 16400  16401 -16402 -88 -16403 0
 16400  16401 -16402 -88  16404 0
 16400  16401 -16402 -88 -16405 0

c  2+1 --> break 
c    (-b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧  p_88) -> break
c  in CNF:
c     b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 16400 -16401  16402 -88 1162 0


c  2-1 --> 1
c    (-b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧ -p_88) -> (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0)
c  in CNF:
c     b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_2
c     b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_1
c     b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨  b^{44, 3}_0
c  in DIMACS:
 16400 -16401  16402  88 -16403 0
 16400 -16401  16402  88 -16404 0
 16400 -16401  16402  88  16405 0

c  1-1 --> 0
c    (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0 ∧ -p_88) -> (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧ -b^{44, 3}_0)
c  in CNF:
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_2
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_1
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_0
c  in DIMACS:
 16400  16401 -16402  88 -16403 0
 16400  16401 -16402  88 -16404 0
 16400  16401 -16402  88 -16405 0

c  0-1 --> -1
c    (-b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧ -p_88) -> ( b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0)
c  in CNF:
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨  b^{44, 3}_2
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_1
c     b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨  b^{44, 3}_0
c  in DIMACS:
 16400  16401  16402  88  16403 0
 16400  16401  16402  88 -16404 0
 16400  16401  16402  88  16405 0

c  -1-1 --> -2
c    ( b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧  b^{44, 2}_0 ∧ -p_88) -> ( b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0)
c  in CNF:
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨  b^{44, 3}_2
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨  b^{44, 3}_1
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨  p_88 ∨ -b^{44, 3}_0
c  in DIMACS:
-16400  16401 -16402  88  16403 0
-16400  16401 -16402  88  16404 0
-16400  16401 -16402  88 -16405 0

c  -2-1 --> break 
c    ( b^{44, 2}_2 ∧  b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨  b^{44, 2}_0 ∨  p_88 ∨ break
c  in DIMACS:
-16400 -16401  16402  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 2}_2 ∧ -b^{44, 2}_1 ∧ -b^{44, 2}_0 ∧ true) 
c  in CNF:
c    -b^{44, 2}_2 ∨  b^{44, 2}_1 ∨  b^{44, 2}_0 ∨ false 
c  in DIMACS:
-16400  16401  16402  0

c  3 does not represent an automaton state.
c    -(-b^{44, 2}_2 ∧  b^{44, 2}_1 ∧  b^{44, 2}_0 ∧ true) 
c  in CNF:
c     b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ false 
c  in DIMACS:
 16400 -16401 -16402  0
c  -3 does not represent an automaton state.
c    -( b^{44, 2}_2 ∧  b^{44, 2}_1 ∧  b^{44, 2}_0 ∧ true) 
c  in CNF:
c    -b^{44, 2}_2 ∨ -b^{44, 2}_1 ∨ -b^{44, 2}_0 ∨ false 
c  in DIMACS:
-16400 -16401 -16402  0

c i = 3
c  -2+1 --> -1
c    ( b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧  p_132) -> ( b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0)
c  in CNF:
c    -b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨  b^{44, 4}_2
c    -b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_1
c    -b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨  b^{44, 4}_0
c  in DIMACS:
-16403 -16404  16405 -132  16406 0
-16403 -16404  16405 -132 -16407 0
-16403 -16404  16405 -132  16408 0

c  -1+1 --> 0
c    ( b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0 ∧  p_132) -> (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧ -b^{44, 4}_0)
c  in CNF:
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_2
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_1
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_0
c  in DIMACS:
-16403  16404 -16405 -132 -16406 0
-16403  16404 -16405 -132 -16407 0
-16403  16404 -16405 -132 -16408 0

c  0+1 --> 1
c    (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧  p_132) -> (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0)
c  in CNF:
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_2
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_1
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨  b^{44, 4}_0
c  in DIMACS:
 16403  16404  16405 -132 -16406 0
 16403  16404  16405 -132 -16407 0
 16403  16404  16405 -132  16408 0

c  1+1 --> 2
c    (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0 ∧  p_132) -> (-b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0)
c  in CNF:
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_2
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨  b^{44, 4}_1
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ -p_132 ∨ -b^{44, 4}_0
c  in DIMACS:
 16403  16404 -16405 -132 -16406 0
 16403  16404 -16405 -132  16407 0
 16403  16404 -16405 -132 -16408 0

c  2+1 --> break 
c    (-b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧  p_132) -> break
c  in CNF:
c     b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 16403 -16404  16405 -132 1162 0


c  2-1 --> 1
c    (-b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧ -p_132) -> (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0)
c  in CNF:
c     b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_2
c     b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_1
c     b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨  b^{44, 4}_0
c  in DIMACS:
 16403 -16404  16405  132 -16406 0
 16403 -16404  16405  132 -16407 0
 16403 -16404  16405  132  16408 0

c  1-1 --> 0
c    (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0 ∧ -p_132) -> (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧ -b^{44, 4}_0)
c  in CNF:
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_2
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_1
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_0
c  in DIMACS:
 16403  16404 -16405  132 -16406 0
 16403  16404 -16405  132 -16407 0
 16403  16404 -16405  132 -16408 0

c  0-1 --> -1
c    (-b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧ -p_132) -> ( b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0)
c  in CNF:
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨  b^{44, 4}_2
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_1
c     b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨  b^{44, 4}_0
c  in DIMACS:
 16403  16404  16405  132  16406 0
 16403  16404  16405  132 -16407 0
 16403  16404  16405  132  16408 0

c  -1-1 --> -2
c    ( b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧  b^{44, 3}_0 ∧ -p_132) -> ( b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0)
c  in CNF:
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨  b^{44, 4}_2
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨  b^{44, 4}_1
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨  p_132 ∨ -b^{44, 4}_0
c  in DIMACS:
-16403  16404 -16405  132  16406 0
-16403  16404 -16405  132  16407 0
-16403  16404 -16405  132 -16408 0

c  -2-1 --> break 
c    ( b^{44, 3}_2 ∧  b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨  b^{44, 3}_0 ∨  p_132 ∨ break
c  in DIMACS:
-16403 -16404  16405  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 3}_2 ∧ -b^{44, 3}_1 ∧ -b^{44, 3}_0 ∧ true) 
c  in CNF:
c    -b^{44, 3}_2 ∨  b^{44, 3}_1 ∨  b^{44, 3}_0 ∨ false 
c  in DIMACS:
-16403  16404  16405  0

c  3 does not represent an automaton state.
c    -(-b^{44, 3}_2 ∧  b^{44, 3}_1 ∧  b^{44, 3}_0 ∧ true) 
c  in CNF:
c     b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ false 
c  in DIMACS:
 16403 -16404 -16405  0
c  -3 does not represent an automaton state.
c    -( b^{44, 3}_2 ∧  b^{44, 3}_1 ∧  b^{44, 3}_0 ∧ true) 
c  in CNF:
c    -b^{44, 3}_2 ∨ -b^{44, 3}_1 ∨ -b^{44, 3}_0 ∨ false 
c  in DIMACS:
-16403 -16404 -16405  0

c i = 4
c  -2+1 --> -1
c    ( b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧  p_176) -> ( b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0)
c  in CNF:
c    -b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨  b^{44, 5}_2
c    -b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_1
c    -b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨  b^{44, 5}_0
c  in DIMACS:
-16406 -16407  16408 -176  16409 0
-16406 -16407  16408 -176 -16410 0
-16406 -16407  16408 -176  16411 0

c  -1+1 --> 0
c    ( b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0 ∧  p_176) -> (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧ -b^{44, 5}_0)
c  in CNF:
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_2
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_1
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_0
c  in DIMACS:
-16406  16407 -16408 -176 -16409 0
-16406  16407 -16408 -176 -16410 0
-16406  16407 -16408 -176 -16411 0

c  0+1 --> 1
c    (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧  p_176) -> (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0)
c  in CNF:
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_2
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_1
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨  b^{44, 5}_0
c  in DIMACS:
 16406  16407  16408 -176 -16409 0
 16406  16407  16408 -176 -16410 0
 16406  16407  16408 -176  16411 0

c  1+1 --> 2
c    (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0 ∧  p_176) -> (-b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0)
c  in CNF:
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_2
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨  b^{44, 5}_1
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ -p_176 ∨ -b^{44, 5}_0
c  in DIMACS:
 16406  16407 -16408 -176 -16409 0
 16406  16407 -16408 -176  16410 0
 16406  16407 -16408 -176 -16411 0

c  2+1 --> break 
c    (-b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧  p_176) -> break
c  in CNF:
c     b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 16406 -16407  16408 -176 1162 0


c  2-1 --> 1
c    (-b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧ -p_176) -> (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0)
c  in CNF:
c     b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_2
c     b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_1
c     b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨  b^{44, 5}_0
c  in DIMACS:
 16406 -16407  16408  176 -16409 0
 16406 -16407  16408  176 -16410 0
 16406 -16407  16408  176  16411 0

c  1-1 --> 0
c    (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0 ∧ -p_176) -> (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧ -b^{44, 5}_0)
c  in CNF:
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_2
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_1
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_0
c  in DIMACS:
 16406  16407 -16408  176 -16409 0
 16406  16407 -16408  176 -16410 0
 16406  16407 -16408  176 -16411 0

c  0-1 --> -1
c    (-b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧ -p_176) -> ( b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0)
c  in CNF:
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨  b^{44, 5}_2
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_1
c     b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨  b^{44, 5}_0
c  in DIMACS:
 16406  16407  16408  176  16409 0
 16406  16407  16408  176 -16410 0
 16406  16407  16408  176  16411 0

c  -1-1 --> -2
c    ( b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧  b^{44, 4}_0 ∧ -p_176) -> ( b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0)
c  in CNF:
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨  b^{44, 5}_2
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨  b^{44, 5}_1
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨  p_176 ∨ -b^{44, 5}_0
c  in DIMACS:
-16406  16407 -16408  176  16409 0
-16406  16407 -16408  176  16410 0
-16406  16407 -16408  176 -16411 0

c  -2-1 --> break 
c    ( b^{44, 4}_2 ∧  b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨  b^{44, 4}_0 ∨  p_176 ∨ break
c  in DIMACS:
-16406 -16407  16408  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 4}_2 ∧ -b^{44, 4}_1 ∧ -b^{44, 4}_0 ∧ true) 
c  in CNF:
c    -b^{44, 4}_2 ∨  b^{44, 4}_1 ∨  b^{44, 4}_0 ∨ false 
c  in DIMACS:
-16406  16407  16408  0

c  3 does not represent an automaton state.
c    -(-b^{44, 4}_2 ∧  b^{44, 4}_1 ∧  b^{44, 4}_0 ∧ true) 
c  in CNF:
c     b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ false 
c  in DIMACS:
 16406 -16407 -16408  0
c  -3 does not represent an automaton state.
c    -( b^{44, 4}_2 ∧  b^{44, 4}_1 ∧  b^{44, 4}_0 ∧ true) 
c  in CNF:
c    -b^{44, 4}_2 ∨ -b^{44, 4}_1 ∨ -b^{44, 4}_0 ∨ false 
c  in DIMACS:
-16406 -16407 -16408  0

c i = 5
c  -2+1 --> -1
c    ( b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧  p_220) -> ( b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0)
c  in CNF:
c    -b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨  b^{44, 6}_2
c    -b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_1
c    -b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨  b^{44, 6}_0
c  in DIMACS:
-16409 -16410  16411 -220  16412 0
-16409 -16410  16411 -220 -16413 0
-16409 -16410  16411 -220  16414 0

c  -1+1 --> 0
c    ( b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0 ∧  p_220) -> (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧ -b^{44, 6}_0)
c  in CNF:
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_2
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_1
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_0
c  in DIMACS:
-16409  16410 -16411 -220 -16412 0
-16409  16410 -16411 -220 -16413 0
-16409  16410 -16411 -220 -16414 0

c  0+1 --> 1
c    (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧  p_220) -> (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0)
c  in CNF:
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_2
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_1
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨  b^{44, 6}_0
c  in DIMACS:
 16409  16410  16411 -220 -16412 0
 16409  16410  16411 -220 -16413 0
 16409  16410  16411 -220  16414 0

c  1+1 --> 2
c    (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0 ∧  p_220) -> (-b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0)
c  in CNF:
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_2
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨  b^{44, 6}_1
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ -p_220 ∨ -b^{44, 6}_0
c  in DIMACS:
 16409  16410 -16411 -220 -16412 0
 16409  16410 -16411 -220  16413 0
 16409  16410 -16411 -220 -16414 0

c  2+1 --> break 
c    (-b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧  p_220) -> break
c  in CNF:
c     b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 16409 -16410  16411 -220 1162 0


c  2-1 --> 1
c    (-b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧ -p_220) -> (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0)
c  in CNF:
c     b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_2
c     b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_1
c     b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨  b^{44, 6}_0
c  in DIMACS:
 16409 -16410  16411  220 -16412 0
 16409 -16410  16411  220 -16413 0
 16409 -16410  16411  220  16414 0

c  1-1 --> 0
c    (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0 ∧ -p_220) -> (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧ -b^{44, 6}_0)
c  in CNF:
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_2
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_1
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_0
c  in DIMACS:
 16409  16410 -16411  220 -16412 0
 16409  16410 -16411  220 -16413 0
 16409  16410 -16411  220 -16414 0

c  0-1 --> -1
c    (-b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧ -p_220) -> ( b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0)
c  in CNF:
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨  b^{44, 6}_2
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_1
c     b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨  b^{44, 6}_0
c  in DIMACS:
 16409  16410  16411  220  16412 0
 16409  16410  16411  220 -16413 0
 16409  16410  16411  220  16414 0

c  -1-1 --> -2
c    ( b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧  b^{44, 5}_0 ∧ -p_220) -> ( b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0)
c  in CNF:
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨  b^{44, 6}_2
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨  b^{44, 6}_1
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨  p_220 ∨ -b^{44, 6}_0
c  in DIMACS:
-16409  16410 -16411  220  16412 0
-16409  16410 -16411  220  16413 0
-16409  16410 -16411  220 -16414 0

c  -2-1 --> break 
c    ( b^{44, 5}_2 ∧  b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨  b^{44, 5}_0 ∨  p_220 ∨ break
c  in DIMACS:
-16409 -16410  16411  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 5}_2 ∧ -b^{44, 5}_1 ∧ -b^{44, 5}_0 ∧ true) 
c  in CNF:
c    -b^{44, 5}_2 ∨  b^{44, 5}_1 ∨  b^{44, 5}_0 ∨ false 
c  in DIMACS:
-16409  16410  16411  0

c  3 does not represent an automaton state.
c    -(-b^{44, 5}_2 ∧  b^{44, 5}_1 ∧  b^{44, 5}_0 ∧ true) 
c  in CNF:
c     b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ false 
c  in DIMACS:
 16409 -16410 -16411  0
c  -3 does not represent an automaton state.
c    -( b^{44, 5}_2 ∧  b^{44, 5}_1 ∧  b^{44, 5}_0 ∧ true) 
c  in CNF:
c    -b^{44, 5}_2 ∨ -b^{44, 5}_1 ∨ -b^{44, 5}_0 ∨ false 
c  in DIMACS:
-16409 -16410 -16411  0

c i = 6
c  -2+1 --> -1
c    ( b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧  p_264) -> ( b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0)
c  in CNF:
c    -b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨  b^{44, 7}_2
c    -b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_1
c    -b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨  b^{44, 7}_0
c  in DIMACS:
-16412 -16413  16414 -264  16415 0
-16412 -16413  16414 -264 -16416 0
-16412 -16413  16414 -264  16417 0

c  -1+1 --> 0
c    ( b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0 ∧  p_264) -> (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧ -b^{44, 7}_0)
c  in CNF:
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_2
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_1
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_0
c  in DIMACS:
-16412  16413 -16414 -264 -16415 0
-16412  16413 -16414 -264 -16416 0
-16412  16413 -16414 -264 -16417 0

c  0+1 --> 1
c    (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧  p_264) -> (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0)
c  in CNF:
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_2
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_1
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨  b^{44, 7}_0
c  in DIMACS:
 16412  16413  16414 -264 -16415 0
 16412  16413  16414 -264 -16416 0
 16412  16413  16414 -264  16417 0

c  1+1 --> 2
c    (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0 ∧  p_264) -> (-b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0)
c  in CNF:
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_2
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨  b^{44, 7}_1
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ -p_264 ∨ -b^{44, 7}_0
c  in DIMACS:
 16412  16413 -16414 -264 -16415 0
 16412  16413 -16414 -264  16416 0
 16412  16413 -16414 -264 -16417 0

c  2+1 --> break 
c    (-b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧  p_264) -> break
c  in CNF:
c     b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 16412 -16413  16414 -264 1162 0


c  2-1 --> 1
c    (-b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧ -p_264) -> (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0)
c  in CNF:
c     b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_2
c     b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_1
c     b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨  b^{44, 7}_0
c  in DIMACS:
 16412 -16413  16414  264 -16415 0
 16412 -16413  16414  264 -16416 0
 16412 -16413  16414  264  16417 0

c  1-1 --> 0
c    (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0 ∧ -p_264) -> (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧ -b^{44, 7}_0)
c  in CNF:
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_2
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_1
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_0
c  in DIMACS:
 16412  16413 -16414  264 -16415 0
 16412  16413 -16414  264 -16416 0
 16412  16413 -16414  264 -16417 0

c  0-1 --> -1
c    (-b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧ -p_264) -> ( b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0)
c  in CNF:
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨  b^{44, 7}_2
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_1
c     b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨  b^{44, 7}_0
c  in DIMACS:
 16412  16413  16414  264  16415 0
 16412  16413  16414  264 -16416 0
 16412  16413  16414  264  16417 0

c  -1-1 --> -2
c    ( b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧  b^{44, 6}_0 ∧ -p_264) -> ( b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0)
c  in CNF:
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨  b^{44, 7}_2
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨  b^{44, 7}_1
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨  p_264 ∨ -b^{44, 7}_0
c  in DIMACS:
-16412  16413 -16414  264  16415 0
-16412  16413 -16414  264  16416 0
-16412  16413 -16414  264 -16417 0

c  -2-1 --> break 
c    ( b^{44, 6}_2 ∧  b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨  b^{44, 6}_0 ∨  p_264 ∨ break
c  in DIMACS:
-16412 -16413  16414  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 6}_2 ∧ -b^{44, 6}_1 ∧ -b^{44, 6}_0 ∧ true) 
c  in CNF:
c    -b^{44, 6}_2 ∨  b^{44, 6}_1 ∨  b^{44, 6}_0 ∨ false 
c  in DIMACS:
-16412  16413  16414  0

c  3 does not represent an automaton state.
c    -(-b^{44, 6}_2 ∧  b^{44, 6}_1 ∧  b^{44, 6}_0 ∧ true) 
c  in CNF:
c     b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ false 
c  in DIMACS:
 16412 -16413 -16414  0
c  -3 does not represent an automaton state.
c    -( b^{44, 6}_2 ∧  b^{44, 6}_1 ∧  b^{44, 6}_0 ∧ true) 
c  in CNF:
c    -b^{44, 6}_2 ∨ -b^{44, 6}_1 ∨ -b^{44, 6}_0 ∨ false 
c  in DIMACS:
-16412 -16413 -16414  0

c i = 7
c  -2+1 --> -1
c    ( b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧  p_308) -> ( b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0)
c  in CNF:
c    -b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨  b^{44, 8}_2
c    -b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_1
c    -b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨  b^{44, 8}_0
c  in DIMACS:
-16415 -16416  16417 -308  16418 0
-16415 -16416  16417 -308 -16419 0
-16415 -16416  16417 -308  16420 0

c  -1+1 --> 0
c    ( b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0 ∧  p_308) -> (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧ -b^{44, 8}_0)
c  in CNF:
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_2
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_1
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_0
c  in DIMACS:
-16415  16416 -16417 -308 -16418 0
-16415  16416 -16417 -308 -16419 0
-16415  16416 -16417 -308 -16420 0

c  0+1 --> 1
c    (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧  p_308) -> (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0)
c  in CNF:
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_2
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_1
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨  b^{44, 8}_0
c  in DIMACS:
 16415  16416  16417 -308 -16418 0
 16415  16416  16417 -308 -16419 0
 16415  16416  16417 -308  16420 0

c  1+1 --> 2
c    (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0 ∧  p_308) -> (-b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0)
c  in CNF:
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_2
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨  b^{44, 8}_1
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ -p_308 ∨ -b^{44, 8}_0
c  in DIMACS:
 16415  16416 -16417 -308 -16418 0
 16415  16416 -16417 -308  16419 0
 16415  16416 -16417 -308 -16420 0

c  2+1 --> break 
c    (-b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧  p_308) -> break
c  in CNF:
c     b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 16415 -16416  16417 -308 1162 0


c  2-1 --> 1
c    (-b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧ -p_308) -> (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0)
c  in CNF:
c     b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_2
c     b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_1
c     b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨  b^{44, 8}_0
c  in DIMACS:
 16415 -16416  16417  308 -16418 0
 16415 -16416  16417  308 -16419 0
 16415 -16416  16417  308  16420 0

c  1-1 --> 0
c    (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0 ∧ -p_308) -> (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧ -b^{44, 8}_0)
c  in CNF:
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_2
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_1
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_0
c  in DIMACS:
 16415  16416 -16417  308 -16418 0
 16415  16416 -16417  308 -16419 0
 16415  16416 -16417  308 -16420 0

c  0-1 --> -1
c    (-b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧ -p_308) -> ( b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0)
c  in CNF:
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨  b^{44, 8}_2
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_1
c     b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨  b^{44, 8}_0
c  in DIMACS:
 16415  16416  16417  308  16418 0
 16415  16416  16417  308 -16419 0
 16415  16416  16417  308  16420 0

c  -1-1 --> -2
c    ( b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧  b^{44, 7}_0 ∧ -p_308) -> ( b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0)
c  in CNF:
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨  b^{44, 8}_2
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨  b^{44, 8}_1
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨  p_308 ∨ -b^{44, 8}_0
c  in DIMACS:
-16415  16416 -16417  308  16418 0
-16415  16416 -16417  308  16419 0
-16415  16416 -16417  308 -16420 0

c  -2-1 --> break 
c    ( b^{44, 7}_2 ∧  b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨  b^{44, 7}_0 ∨  p_308 ∨ break
c  in DIMACS:
-16415 -16416  16417  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 7}_2 ∧ -b^{44, 7}_1 ∧ -b^{44, 7}_0 ∧ true) 
c  in CNF:
c    -b^{44, 7}_2 ∨  b^{44, 7}_1 ∨  b^{44, 7}_0 ∨ false 
c  in DIMACS:
-16415  16416  16417  0

c  3 does not represent an automaton state.
c    -(-b^{44, 7}_2 ∧  b^{44, 7}_1 ∧  b^{44, 7}_0 ∧ true) 
c  in CNF:
c     b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ false 
c  in DIMACS:
 16415 -16416 -16417  0
c  -3 does not represent an automaton state.
c    -( b^{44, 7}_2 ∧  b^{44, 7}_1 ∧  b^{44, 7}_0 ∧ true) 
c  in CNF:
c    -b^{44, 7}_2 ∨ -b^{44, 7}_1 ∨ -b^{44, 7}_0 ∨ false 
c  in DIMACS:
-16415 -16416 -16417  0

c i = 8
c  -2+1 --> -1
c    ( b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧  p_352) -> ( b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0)
c  in CNF:
c    -b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨  b^{44, 9}_2
c    -b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_1
c    -b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨  b^{44, 9}_0
c  in DIMACS:
-16418 -16419  16420 -352  16421 0
-16418 -16419  16420 -352 -16422 0
-16418 -16419  16420 -352  16423 0

c  -1+1 --> 0
c    ( b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0 ∧  p_352) -> (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧ -b^{44, 9}_0)
c  in CNF:
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_2
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_1
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_0
c  in DIMACS:
-16418  16419 -16420 -352 -16421 0
-16418  16419 -16420 -352 -16422 0
-16418  16419 -16420 -352 -16423 0

c  0+1 --> 1
c    (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧  p_352) -> (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0)
c  in CNF:
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_2
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_1
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨  b^{44, 9}_0
c  in DIMACS:
 16418  16419  16420 -352 -16421 0
 16418  16419  16420 -352 -16422 0
 16418  16419  16420 -352  16423 0

c  1+1 --> 2
c    (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0 ∧  p_352) -> (-b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0)
c  in CNF:
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_2
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨  b^{44, 9}_1
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ -p_352 ∨ -b^{44, 9}_0
c  in DIMACS:
 16418  16419 -16420 -352 -16421 0
 16418  16419 -16420 -352  16422 0
 16418  16419 -16420 -352 -16423 0

c  2+1 --> break 
c    (-b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧  p_352) -> break
c  in CNF:
c     b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 16418 -16419  16420 -352 1162 0


c  2-1 --> 1
c    (-b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧ -p_352) -> (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0)
c  in CNF:
c     b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_2
c     b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_1
c     b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨  b^{44, 9}_0
c  in DIMACS:
 16418 -16419  16420  352 -16421 0
 16418 -16419  16420  352 -16422 0
 16418 -16419  16420  352  16423 0

c  1-1 --> 0
c    (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0 ∧ -p_352) -> (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧ -b^{44, 9}_0)
c  in CNF:
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_2
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_1
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_0
c  in DIMACS:
 16418  16419 -16420  352 -16421 0
 16418  16419 -16420  352 -16422 0
 16418  16419 -16420  352 -16423 0

c  0-1 --> -1
c    (-b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧ -p_352) -> ( b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0)
c  in CNF:
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨  b^{44, 9}_2
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_1
c     b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨  b^{44, 9}_0
c  in DIMACS:
 16418  16419  16420  352  16421 0
 16418  16419  16420  352 -16422 0
 16418  16419  16420  352  16423 0

c  -1-1 --> -2
c    ( b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧  b^{44, 8}_0 ∧ -p_352) -> ( b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0)
c  in CNF:
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨  b^{44, 9}_2
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨  b^{44, 9}_1
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨  p_352 ∨ -b^{44, 9}_0
c  in DIMACS:
-16418  16419 -16420  352  16421 0
-16418  16419 -16420  352  16422 0
-16418  16419 -16420  352 -16423 0

c  -2-1 --> break 
c    ( b^{44, 8}_2 ∧  b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨  b^{44, 8}_0 ∨  p_352 ∨ break
c  in DIMACS:
-16418 -16419  16420  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 8}_2 ∧ -b^{44, 8}_1 ∧ -b^{44, 8}_0 ∧ true) 
c  in CNF:
c    -b^{44, 8}_2 ∨  b^{44, 8}_1 ∨  b^{44, 8}_0 ∨ false 
c  in DIMACS:
-16418  16419  16420  0

c  3 does not represent an automaton state.
c    -(-b^{44, 8}_2 ∧  b^{44, 8}_1 ∧  b^{44, 8}_0 ∧ true) 
c  in CNF:
c     b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ false 
c  in DIMACS:
 16418 -16419 -16420  0
c  -3 does not represent an automaton state.
c    -( b^{44, 8}_2 ∧  b^{44, 8}_1 ∧  b^{44, 8}_0 ∧ true) 
c  in CNF:
c    -b^{44, 8}_2 ∨ -b^{44, 8}_1 ∨ -b^{44, 8}_0 ∨ false 
c  in DIMACS:
-16418 -16419 -16420  0

c i = 9
c  -2+1 --> -1
c    ( b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧  p_396) -> ( b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0)
c  in CNF:
c    -b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨  b^{44, 10}_2
c    -b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_1
c    -b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨  b^{44, 10}_0
c  in DIMACS:
-16421 -16422  16423 -396  16424 0
-16421 -16422  16423 -396 -16425 0
-16421 -16422  16423 -396  16426 0

c  -1+1 --> 0
c    ( b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0 ∧  p_396) -> (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧ -b^{44, 10}_0)
c  in CNF:
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_2
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_1
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_0
c  in DIMACS:
-16421  16422 -16423 -396 -16424 0
-16421  16422 -16423 -396 -16425 0
-16421  16422 -16423 -396 -16426 0

c  0+1 --> 1
c    (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧  p_396) -> (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0)
c  in CNF:
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_2
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_1
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨  b^{44, 10}_0
c  in DIMACS:
 16421  16422  16423 -396 -16424 0
 16421  16422  16423 -396 -16425 0
 16421  16422  16423 -396  16426 0

c  1+1 --> 2
c    (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0 ∧  p_396) -> (-b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0)
c  in CNF:
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_2
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨  b^{44, 10}_1
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ -p_396 ∨ -b^{44, 10}_0
c  in DIMACS:
 16421  16422 -16423 -396 -16424 0
 16421  16422 -16423 -396  16425 0
 16421  16422 -16423 -396 -16426 0

c  2+1 --> break 
c    (-b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧  p_396) -> break
c  in CNF:
c     b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 16421 -16422  16423 -396 1162 0


c  2-1 --> 1
c    (-b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧ -p_396) -> (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0)
c  in CNF:
c     b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_2
c     b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_1
c     b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨  b^{44, 10}_0
c  in DIMACS:
 16421 -16422  16423  396 -16424 0
 16421 -16422  16423  396 -16425 0
 16421 -16422  16423  396  16426 0

c  1-1 --> 0
c    (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0 ∧ -p_396) -> (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧ -b^{44, 10}_0)
c  in CNF:
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_2
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_1
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_0
c  in DIMACS:
 16421  16422 -16423  396 -16424 0
 16421  16422 -16423  396 -16425 0
 16421  16422 -16423  396 -16426 0

c  0-1 --> -1
c    (-b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧ -p_396) -> ( b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0)
c  in CNF:
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨  b^{44, 10}_2
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_1
c     b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨  b^{44, 10}_0
c  in DIMACS:
 16421  16422  16423  396  16424 0
 16421  16422  16423  396 -16425 0
 16421  16422  16423  396  16426 0

c  -1-1 --> -2
c    ( b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧  b^{44, 9}_0 ∧ -p_396) -> ( b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0)
c  in CNF:
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨  b^{44, 10}_2
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨  b^{44, 10}_1
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨  p_396 ∨ -b^{44, 10}_0
c  in DIMACS:
-16421  16422 -16423  396  16424 0
-16421  16422 -16423  396  16425 0
-16421  16422 -16423  396 -16426 0

c  -2-1 --> break 
c    ( b^{44, 9}_2 ∧  b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨  b^{44, 9}_0 ∨  p_396 ∨ break
c  in DIMACS:
-16421 -16422  16423  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 9}_2 ∧ -b^{44, 9}_1 ∧ -b^{44, 9}_0 ∧ true) 
c  in CNF:
c    -b^{44, 9}_2 ∨  b^{44, 9}_1 ∨  b^{44, 9}_0 ∨ false 
c  in DIMACS:
-16421  16422  16423  0

c  3 does not represent an automaton state.
c    -(-b^{44, 9}_2 ∧  b^{44, 9}_1 ∧  b^{44, 9}_0 ∧ true) 
c  in CNF:
c     b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ false 
c  in DIMACS:
 16421 -16422 -16423  0
c  -3 does not represent an automaton state.
c    -( b^{44, 9}_2 ∧  b^{44, 9}_1 ∧  b^{44, 9}_0 ∧ true) 
c  in CNF:
c    -b^{44, 9}_2 ∨ -b^{44, 9}_1 ∨ -b^{44, 9}_0 ∨ false 
c  in DIMACS:
-16421 -16422 -16423  0

c i = 10
c  -2+1 --> -1
c    ( b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧  p_440) -> ( b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0)
c  in CNF:
c    -b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨  b^{44, 11}_2
c    -b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_1
c    -b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨  b^{44, 11}_0
c  in DIMACS:
-16424 -16425  16426 -440  16427 0
-16424 -16425  16426 -440 -16428 0
-16424 -16425  16426 -440  16429 0

c  -1+1 --> 0
c    ( b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0 ∧  p_440) -> (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧ -b^{44, 11}_0)
c  in CNF:
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_2
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_1
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_0
c  in DIMACS:
-16424  16425 -16426 -440 -16427 0
-16424  16425 -16426 -440 -16428 0
-16424  16425 -16426 -440 -16429 0

c  0+1 --> 1
c    (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧  p_440) -> (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0)
c  in CNF:
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_2
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_1
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨  b^{44, 11}_0
c  in DIMACS:
 16424  16425  16426 -440 -16427 0
 16424  16425  16426 -440 -16428 0
 16424  16425  16426 -440  16429 0

c  1+1 --> 2
c    (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0 ∧  p_440) -> (-b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0)
c  in CNF:
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_2
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨  b^{44, 11}_1
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ -p_440 ∨ -b^{44, 11}_0
c  in DIMACS:
 16424  16425 -16426 -440 -16427 0
 16424  16425 -16426 -440  16428 0
 16424  16425 -16426 -440 -16429 0

c  2+1 --> break 
c    (-b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧  p_440) -> break
c  in CNF:
c     b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 16424 -16425  16426 -440 1162 0


c  2-1 --> 1
c    (-b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧ -p_440) -> (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0)
c  in CNF:
c     b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_2
c     b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_1
c     b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨  b^{44, 11}_0
c  in DIMACS:
 16424 -16425  16426  440 -16427 0
 16424 -16425  16426  440 -16428 0
 16424 -16425  16426  440  16429 0

c  1-1 --> 0
c    (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0 ∧ -p_440) -> (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧ -b^{44, 11}_0)
c  in CNF:
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_2
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_1
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_0
c  in DIMACS:
 16424  16425 -16426  440 -16427 0
 16424  16425 -16426  440 -16428 0
 16424  16425 -16426  440 -16429 0

c  0-1 --> -1
c    (-b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧ -p_440) -> ( b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0)
c  in CNF:
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨  b^{44, 11}_2
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_1
c     b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨  b^{44, 11}_0
c  in DIMACS:
 16424  16425  16426  440  16427 0
 16424  16425  16426  440 -16428 0
 16424  16425  16426  440  16429 0

c  -1-1 --> -2
c    ( b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧  b^{44, 10}_0 ∧ -p_440) -> ( b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0)
c  in CNF:
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨  b^{44, 11}_2
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨  b^{44, 11}_1
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨  p_440 ∨ -b^{44, 11}_0
c  in DIMACS:
-16424  16425 -16426  440  16427 0
-16424  16425 -16426  440  16428 0
-16424  16425 -16426  440 -16429 0

c  -2-1 --> break 
c    ( b^{44, 10}_2 ∧  b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨  b^{44, 10}_0 ∨  p_440 ∨ break
c  in DIMACS:
-16424 -16425  16426  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 10}_2 ∧ -b^{44, 10}_1 ∧ -b^{44, 10}_0 ∧ true) 
c  in CNF:
c    -b^{44, 10}_2 ∨  b^{44, 10}_1 ∨  b^{44, 10}_0 ∨ false 
c  in DIMACS:
-16424  16425  16426  0

c  3 does not represent an automaton state.
c    -(-b^{44, 10}_2 ∧  b^{44, 10}_1 ∧  b^{44, 10}_0 ∧ true) 
c  in CNF:
c     b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ false 
c  in DIMACS:
 16424 -16425 -16426  0
c  -3 does not represent an automaton state.
c    -( b^{44, 10}_2 ∧  b^{44, 10}_1 ∧  b^{44, 10}_0 ∧ true) 
c  in CNF:
c    -b^{44, 10}_2 ∨ -b^{44, 10}_1 ∨ -b^{44, 10}_0 ∨ false 
c  in DIMACS:
-16424 -16425 -16426  0

c i = 11
c  -2+1 --> -1
c    ( b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧  p_484) -> ( b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0)
c  in CNF:
c    -b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨  b^{44, 12}_2
c    -b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_1
c    -b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨  b^{44, 12}_0
c  in DIMACS:
-16427 -16428  16429 -484  16430 0
-16427 -16428  16429 -484 -16431 0
-16427 -16428  16429 -484  16432 0

c  -1+1 --> 0
c    ( b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0 ∧  p_484) -> (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧ -b^{44, 12}_0)
c  in CNF:
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_2
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_1
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_0
c  in DIMACS:
-16427  16428 -16429 -484 -16430 0
-16427  16428 -16429 -484 -16431 0
-16427  16428 -16429 -484 -16432 0

c  0+1 --> 1
c    (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧  p_484) -> (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0)
c  in CNF:
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_2
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_1
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨  b^{44, 12}_0
c  in DIMACS:
 16427  16428  16429 -484 -16430 0
 16427  16428  16429 -484 -16431 0
 16427  16428  16429 -484  16432 0

c  1+1 --> 2
c    (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0 ∧  p_484) -> (-b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0)
c  in CNF:
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_2
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨  b^{44, 12}_1
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ -p_484 ∨ -b^{44, 12}_0
c  in DIMACS:
 16427  16428 -16429 -484 -16430 0
 16427  16428 -16429 -484  16431 0
 16427  16428 -16429 -484 -16432 0

c  2+1 --> break 
c    (-b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧  p_484) -> break
c  in CNF:
c     b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 16427 -16428  16429 -484 1162 0


c  2-1 --> 1
c    (-b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧ -p_484) -> (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0)
c  in CNF:
c     b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_2
c     b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_1
c     b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨  b^{44, 12}_0
c  in DIMACS:
 16427 -16428  16429  484 -16430 0
 16427 -16428  16429  484 -16431 0
 16427 -16428  16429  484  16432 0

c  1-1 --> 0
c    (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0 ∧ -p_484) -> (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧ -b^{44, 12}_0)
c  in CNF:
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_2
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_1
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_0
c  in DIMACS:
 16427  16428 -16429  484 -16430 0
 16427  16428 -16429  484 -16431 0
 16427  16428 -16429  484 -16432 0

c  0-1 --> -1
c    (-b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧ -p_484) -> ( b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0)
c  in CNF:
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨  b^{44, 12}_2
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_1
c     b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨  b^{44, 12}_0
c  in DIMACS:
 16427  16428  16429  484  16430 0
 16427  16428  16429  484 -16431 0
 16427  16428  16429  484  16432 0

c  -1-1 --> -2
c    ( b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧  b^{44, 11}_0 ∧ -p_484) -> ( b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0)
c  in CNF:
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨  b^{44, 12}_2
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨  b^{44, 12}_1
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨  p_484 ∨ -b^{44, 12}_0
c  in DIMACS:
-16427  16428 -16429  484  16430 0
-16427  16428 -16429  484  16431 0
-16427  16428 -16429  484 -16432 0

c  -2-1 --> break 
c    ( b^{44, 11}_2 ∧  b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨  b^{44, 11}_0 ∨  p_484 ∨ break
c  in DIMACS:
-16427 -16428  16429  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 11}_2 ∧ -b^{44, 11}_1 ∧ -b^{44, 11}_0 ∧ true) 
c  in CNF:
c    -b^{44, 11}_2 ∨  b^{44, 11}_1 ∨  b^{44, 11}_0 ∨ false 
c  in DIMACS:
-16427  16428  16429  0

c  3 does not represent an automaton state.
c    -(-b^{44, 11}_2 ∧  b^{44, 11}_1 ∧  b^{44, 11}_0 ∧ true) 
c  in CNF:
c     b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ false 
c  in DIMACS:
 16427 -16428 -16429  0
c  -3 does not represent an automaton state.
c    -( b^{44, 11}_2 ∧  b^{44, 11}_1 ∧  b^{44, 11}_0 ∧ true) 
c  in CNF:
c    -b^{44, 11}_2 ∨ -b^{44, 11}_1 ∨ -b^{44, 11}_0 ∨ false 
c  in DIMACS:
-16427 -16428 -16429  0

c i = 12
c  -2+1 --> -1
c    ( b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧  p_528) -> ( b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0)
c  in CNF:
c    -b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨  b^{44, 13}_2
c    -b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_1
c    -b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨  b^{44, 13}_0
c  in DIMACS:
-16430 -16431  16432 -528  16433 0
-16430 -16431  16432 -528 -16434 0
-16430 -16431  16432 -528  16435 0

c  -1+1 --> 0
c    ( b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0 ∧  p_528) -> (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧ -b^{44, 13}_0)
c  in CNF:
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_2
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_1
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_0
c  in DIMACS:
-16430  16431 -16432 -528 -16433 0
-16430  16431 -16432 -528 -16434 0
-16430  16431 -16432 -528 -16435 0

c  0+1 --> 1
c    (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧  p_528) -> (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0)
c  in CNF:
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_2
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_1
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨  b^{44, 13}_0
c  in DIMACS:
 16430  16431  16432 -528 -16433 0
 16430  16431  16432 -528 -16434 0
 16430  16431  16432 -528  16435 0

c  1+1 --> 2
c    (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0 ∧  p_528) -> (-b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0)
c  in CNF:
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_2
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨  b^{44, 13}_1
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ -p_528 ∨ -b^{44, 13}_0
c  in DIMACS:
 16430  16431 -16432 -528 -16433 0
 16430  16431 -16432 -528  16434 0
 16430  16431 -16432 -528 -16435 0

c  2+1 --> break 
c    (-b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧  p_528) -> break
c  in CNF:
c     b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 16430 -16431  16432 -528 1162 0


c  2-1 --> 1
c    (-b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧ -p_528) -> (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0)
c  in CNF:
c     b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_2
c     b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_1
c     b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨  b^{44, 13}_0
c  in DIMACS:
 16430 -16431  16432  528 -16433 0
 16430 -16431  16432  528 -16434 0
 16430 -16431  16432  528  16435 0

c  1-1 --> 0
c    (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0 ∧ -p_528) -> (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧ -b^{44, 13}_0)
c  in CNF:
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_2
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_1
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_0
c  in DIMACS:
 16430  16431 -16432  528 -16433 0
 16430  16431 -16432  528 -16434 0
 16430  16431 -16432  528 -16435 0

c  0-1 --> -1
c    (-b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧ -p_528) -> ( b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0)
c  in CNF:
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨  b^{44, 13}_2
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_1
c     b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨  b^{44, 13}_0
c  in DIMACS:
 16430  16431  16432  528  16433 0
 16430  16431  16432  528 -16434 0
 16430  16431  16432  528  16435 0

c  -1-1 --> -2
c    ( b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧  b^{44, 12}_0 ∧ -p_528) -> ( b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0)
c  in CNF:
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨  b^{44, 13}_2
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨  b^{44, 13}_1
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨  p_528 ∨ -b^{44, 13}_0
c  in DIMACS:
-16430  16431 -16432  528  16433 0
-16430  16431 -16432  528  16434 0
-16430  16431 -16432  528 -16435 0

c  -2-1 --> break 
c    ( b^{44, 12}_2 ∧  b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨  b^{44, 12}_0 ∨  p_528 ∨ break
c  in DIMACS:
-16430 -16431  16432  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 12}_2 ∧ -b^{44, 12}_1 ∧ -b^{44, 12}_0 ∧ true) 
c  in CNF:
c    -b^{44, 12}_2 ∨  b^{44, 12}_1 ∨  b^{44, 12}_0 ∨ false 
c  in DIMACS:
-16430  16431  16432  0

c  3 does not represent an automaton state.
c    -(-b^{44, 12}_2 ∧  b^{44, 12}_1 ∧  b^{44, 12}_0 ∧ true) 
c  in CNF:
c     b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ false 
c  in DIMACS:
 16430 -16431 -16432  0
c  -3 does not represent an automaton state.
c    -( b^{44, 12}_2 ∧  b^{44, 12}_1 ∧  b^{44, 12}_0 ∧ true) 
c  in CNF:
c    -b^{44, 12}_2 ∨ -b^{44, 12}_1 ∨ -b^{44, 12}_0 ∨ false 
c  in DIMACS:
-16430 -16431 -16432  0

c i = 13
c  -2+1 --> -1
c    ( b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧  p_572) -> ( b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0)
c  in CNF:
c    -b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨  b^{44, 14}_2
c    -b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_1
c    -b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨  b^{44, 14}_0
c  in DIMACS:
-16433 -16434  16435 -572  16436 0
-16433 -16434  16435 -572 -16437 0
-16433 -16434  16435 -572  16438 0

c  -1+1 --> 0
c    ( b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0 ∧  p_572) -> (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧ -b^{44, 14}_0)
c  in CNF:
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_2
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_1
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_0
c  in DIMACS:
-16433  16434 -16435 -572 -16436 0
-16433  16434 -16435 -572 -16437 0
-16433  16434 -16435 -572 -16438 0

c  0+1 --> 1
c    (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧  p_572) -> (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0)
c  in CNF:
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_2
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_1
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨  b^{44, 14}_0
c  in DIMACS:
 16433  16434  16435 -572 -16436 0
 16433  16434  16435 -572 -16437 0
 16433  16434  16435 -572  16438 0

c  1+1 --> 2
c    (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0 ∧  p_572) -> (-b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0)
c  in CNF:
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_2
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨  b^{44, 14}_1
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ -p_572 ∨ -b^{44, 14}_0
c  in DIMACS:
 16433  16434 -16435 -572 -16436 0
 16433  16434 -16435 -572  16437 0
 16433  16434 -16435 -572 -16438 0

c  2+1 --> break 
c    (-b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧  p_572) -> break
c  in CNF:
c     b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 16433 -16434  16435 -572 1162 0


c  2-1 --> 1
c    (-b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧ -p_572) -> (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0)
c  in CNF:
c     b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_2
c     b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_1
c     b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨  b^{44, 14}_0
c  in DIMACS:
 16433 -16434  16435  572 -16436 0
 16433 -16434  16435  572 -16437 0
 16433 -16434  16435  572  16438 0

c  1-1 --> 0
c    (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0 ∧ -p_572) -> (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧ -b^{44, 14}_0)
c  in CNF:
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_2
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_1
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_0
c  in DIMACS:
 16433  16434 -16435  572 -16436 0
 16433  16434 -16435  572 -16437 0
 16433  16434 -16435  572 -16438 0

c  0-1 --> -1
c    (-b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧ -p_572) -> ( b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0)
c  in CNF:
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨  b^{44, 14}_2
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_1
c     b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨  b^{44, 14}_0
c  in DIMACS:
 16433  16434  16435  572  16436 0
 16433  16434  16435  572 -16437 0
 16433  16434  16435  572  16438 0

c  -1-1 --> -2
c    ( b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧  b^{44, 13}_0 ∧ -p_572) -> ( b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0)
c  in CNF:
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨  b^{44, 14}_2
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨  b^{44, 14}_1
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨  p_572 ∨ -b^{44, 14}_0
c  in DIMACS:
-16433  16434 -16435  572  16436 0
-16433  16434 -16435  572  16437 0
-16433  16434 -16435  572 -16438 0

c  -2-1 --> break 
c    ( b^{44, 13}_2 ∧  b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨  b^{44, 13}_0 ∨  p_572 ∨ break
c  in DIMACS:
-16433 -16434  16435  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 13}_2 ∧ -b^{44, 13}_1 ∧ -b^{44, 13}_0 ∧ true) 
c  in CNF:
c    -b^{44, 13}_2 ∨  b^{44, 13}_1 ∨  b^{44, 13}_0 ∨ false 
c  in DIMACS:
-16433  16434  16435  0

c  3 does not represent an automaton state.
c    -(-b^{44, 13}_2 ∧  b^{44, 13}_1 ∧  b^{44, 13}_0 ∧ true) 
c  in CNF:
c     b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ false 
c  in DIMACS:
 16433 -16434 -16435  0
c  -3 does not represent an automaton state.
c    -( b^{44, 13}_2 ∧  b^{44, 13}_1 ∧  b^{44, 13}_0 ∧ true) 
c  in CNF:
c    -b^{44, 13}_2 ∨ -b^{44, 13}_1 ∨ -b^{44, 13}_0 ∨ false 
c  in DIMACS:
-16433 -16434 -16435  0

c i = 14
c  -2+1 --> -1
c    ( b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧  p_616) -> ( b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0)
c  in CNF:
c    -b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨  b^{44, 15}_2
c    -b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_1
c    -b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨  b^{44, 15}_0
c  in DIMACS:
-16436 -16437  16438 -616  16439 0
-16436 -16437  16438 -616 -16440 0
-16436 -16437  16438 -616  16441 0

c  -1+1 --> 0
c    ( b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0 ∧  p_616) -> (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧ -b^{44, 15}_0)
c  in CNF:
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_2
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_1
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_0
c  in DIMACS:
-16436  16437 -16438 -616 -16439 0
-16436  16437 -16438 -616 -16440 0
-16436  16437 -16438 -616 -16441 0

c  0+1 --> 1
c    (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧  p_616) -> (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0)
c  in CNF:
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_2
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_1
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨  b^{44, 15}_0
c  in DIMACS:
 16436  16437  16438 -616 -16439 0
 16436  16437  16438 -616 -16440 0
 16436  16437  16438 -616  16441 0

c  1+1 --> 2
c    (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0 ∧  p_616) -> (-b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0)
c  in CNF:
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_2
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨  b^{44, 15}_1
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ -p_616 ∨ -b^{44, 15}_0
c  in DIMACS:
 16436  16437 -16438 -616 -16439 0
 16436  16437 -16438 -616  16440 0
 16436  16437 -16438 -616 -16441 0

c  2+1 --> break 
c    (-b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧  p_616) -> break
c  in CNF:
c     b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 16436 -16437  16438 -616 1162 0


c  2-1 --> 1
c    (-b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧ -p_616) -> (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0)
c  in CNF:
c     b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_2
c     b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_1
c     b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨  b^{44, 15}_0
c  in DIMACS:
 16436 -16437  16438  616 -16439 0
 16436 -16437  16438  616 -16440 0
 16436 -16437  16438  616  16441 0

c  1-1 --> 0
c    (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0 ∧ -p_616) -> (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧ -b^{44, 15}_0)
c  in CNF:
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_2
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_1
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_0
c  in DIMACS:
 16436  16437 -16438  616 -16439 0
 16436  16437 -16438  616 -16440 0
 16436  16437 -16438  616 -16441 0

c  0-1 --> -1
c    (-b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧ -p_616) -> ( b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0)
c  in CNF:
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨  b^{44, 15}_2
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_1
c     b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨  b^{44, 15}_0
c  in DIMACS:
 16436  16437  16438  616  16439 0
 16436  16437  16438  616 -16440 0
 16436  16437  16438  616  16441 0

c  -1-1 --> -2
c    ( b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧  b^{44, 14}_0 ∧ -p_616) -> ( b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0)
c  in CNF:
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨  b^{44, 15}_2
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨  b^{44, 15}_1
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨  p_616 ∨ -b^{44, 15}_0
c  in DIMACS:
-16436  16437 -16438  616  16439 0
-16436  16437 -16438  616  16440 0
-16436  16437 -16438  616 -16441 0

c  -2-1 --> break 
c    ( b^{44, 14}_2 ∧  b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨  b^{44, 14}_0 ∨  p_616 ∨ break
c  in DIMACS:
-16436 -16437  16438  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 14}_2 ∧ -b^{44, 14}_1 ∧ -b^{44, 14}_0 ∧ true) 
c  in CNF:
c    -b^{44, 14}_2 ∨  b^{44, 14}_1 ∨  b^{44, 14}_0 ∨ false 
c  in DIMACS:
-16436  16437  16438  0

c  3 does not represent an automaton state.
c    -(-b^{44, 14}_2 ∧  b^{44, 14}_1 ∧  b^{44, 14}_0 ∧ true) 
c  in CNF:
c     b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ false 
c  in DIMACS:
 16436 -16437 -16438  0
c  -3 does not represent an automaton state.
c    -( b^{44, 14}_2 ∧  b^{44, 14}_1 ∧  b^{44, 14}_0 ∧ true) 
c  in CNF:
c    -b^{44, 14}_2 ∨ -b^{44, 14}_1 ∨ -b^{44, 14}_0 ∨ false 
c  in DIMACS:
-16436 -16437 -16438  0

c i = 15
c  -2+1 --> -1
c    ( b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧  p_660) -> ( b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0)
c  in CNF:
c    -b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨  b^{44, 16}_2
c    -b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_1
c    -b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨  b^{44, 16}_0
c  in DIMACS:
-16439 -16440  16441 -660  16442 0
-16439 -16440  16441 -660 -16443 0
-16439 -16440  16441 -660  16444 0

c  -1+1 --> 0
c    ( b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0 ∧  p_660) -> (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧ -b^{44, 16}_0)
c  in CNF:
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_2
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_1
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_0
c  in DIMACS:
-16439  16440 -16441 -660 -16442 0
-16439  16440 -16441 -660 -16443 0
-16439  16440 -16441 -660 -16444 0

c  0+1 --> 1
c    (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧  p_660) -> (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0)
c  in CNF:
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_2
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_1
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨  b^{44, 16}_0
c  in DIMACS:
 16439  16440  16441 -660 -16442 0
 16439  16440  16441 -660 -16443 0
 16439  16440  16441 -660  16444 0

c  1+1 --> 2
c    (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0 ∧  p_660) -> (-b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0)
c  in CNF:
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_2
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨  b^{44, 16}_1
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ -p_660 ∨ -b^{44, 16}_0
c  in DIMACS:
 16439  16440 -16441 -660 -16442 0
 16439  16440 -16441 -660  16443 0
 16439  16440 -16441 -660 -16444 0

c  2+1 --> break 
c    (-b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧  p_660) -> break
c  in CNF:
c     b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 16439 -16440  16441 -660 1162 0


c  2-1 --> 1
c    (-b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧ -p_660) -> (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0)
c  in CNF:
c     b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_2
c     b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_1
c     b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨  b^{44, 16}_0
c  in DIMACS:
 16439 -16440  16441  660 -16442 0
 16439 -16440  16441  660 -16443 0
 16439 -16440  16441  660  16444 0

c  1-1 --> 0
c    (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0 ∧ -p_660) -> (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧ -b^{44, 16}_0)
c  in CNF:
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_2
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_1
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_0
c  in DIMACS:
 16439  16440 -16441  660 -16442 0
 16439  16440 -16441  660 -16443 0
 16439  16440 -16441  660 -16444 0

c  0-1 --> -1
c    (-b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧ -p_660) -> ( b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0)
c  in CNF:
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨  b^{44, 16}_2
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_1
c     b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨  b^{44, 16}_0
c  in DIMACS:
 16439  16440  16441  660  16442 0
 16439  16440  16441  660 -16443 0
 16439  16440  16441  660  16444 0

c  -1-1 --> -2
c    ( b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧  b^{44, 15}_0 ∧ -p_660) -> ( b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0)
c  in CNF:
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨  b^{44, 16}_2
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨  b^{44, 16}_1
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨  p_660 ∨ -b^{44, 16}_0
c  in DIMACS:
-16439  16440 -16441  660  16442 0
-16439  16440 -16441  660  16443 0
-16439  16440 -16441  660 -16444 0

c  -2-1 --> break 
c    ( b^{44, 15}_2 ∧  b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨  b^{44, 15}_0 ∨  p_660 ∨ break
c  in DIMACS:
-16439 -16440  16441  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 15}_2 ∧ -b^{44, 15}_1 ∧ -b^{44, 15}_0 ∧ true) 
c  in CNF:
c    -b^{44, 15}_2 ∨  b^{44, 15}_1 ∨  b^{44, 15}_0 ∨ false 
c  in DIMACS:
-16439  16440  16441  0

c  3 does not represent an automaton state.
c    -(-b^{44, 15}_2 ∧  b^{44, 15}_1 ∧  b^{44, 15}_0 ∧ true) 
c  in CNF:
c     b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ false 
c  in DIMACS:
 16439 -16440 -16441  0
c  -3 does not represent an automaton state.
c    -( b^{44, 15}_2 ∧  b^{44, 15}_1 ∧  b^{44, 15}_0 ∧ true) 
c  in CNF:
c    -b^{44, 15}_2 ∨ -b^{44, 15}_1 ∨ -b^{44, 15}_0 ∨ false 
c  in DIMACS:
-16439 -16440 -16441  0

c i = 16
c  -2+1 --> -1
c    ( b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧  p_704) -> ( b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0)
c  in CNF:
c    -b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨  b^{44, 17}_2
c    -b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_1
c    -b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨  b^{44, 17}_0
c  in DIMACS:
-16442 -16443  16444 -704  16445 0
-16442 -16443  16444 -704 -16446 0
-16442 -16443  16444 -704  16447 0

c  -1+1 --> 0
c    ( b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0 ∧  p_704) -> (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧ -b^{44, 17}_0)
c  in CNF:
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_2
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_1
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_0
c  in DIMACS:
-16442  16443 -16444 -704 -16445 0
-16442  16443 -16444 -704 -16446 0
-16442  16443 -16444 -704 -16447 0

c  0+1 --> 1
c    (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧  p_704) -> (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0)
c  in CNF:
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_2
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_1
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨  b^{44, 17}_0
c  in DIMACS:
 16442  16443  16444 -704 -16445 0
 16442  16443  16444 -704 -16446 0
 16442  16443  16444 -704  16447 0

c  1+1 --> 2
c    (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0 ∧  p_704) -> (-b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0)
c  in CNF:
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_2
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨  b^{44, 17}_1
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ -p_704 ∨ -b^{44, 17}_0
c  in DIMACS:
 16442  16443 -16444 -704 -16445 0
 16442  16443 -16444 -704  16446 0
 16442  16443 -16444 -704 -16447 0

c  2+1 --> break 
c    (-b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧  p_704) -> break
c  in CNF:
c     b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 16442 -16443  16444 -704 1162 0


c  2-1 --> 1
c    (-b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧ -p_704) -> (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0)
c  in CNF:
c     b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_2
c     b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_1
c     b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨  b^{44, 17}_0
c  in DIMACS:
 16442 -16443  16444  704 -16445 0
 16442 -16443  16444  704 -16446 0
 16442 -16443  16444  704  16447 0

c  1-1 --> 0
c    (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0 ∧ -p_704) -> (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧ -b^{44, 17}_0)
c  in CNF:
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_2
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_1
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_0
c  in DIMACS:
 16442  16443 -16444  704 -16445 0
 16442  16443 -16444  704 -16446 0
 16442  16443 -16444  704 -16447 0

c  0-1 --> -1
c    (-b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧ -p_704) -> ( b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0)
c  in CNF:
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨  b^{44, 17}_2
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_1
c     b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨  b^{44, 17}_0
c  in DIMACS:
 16442  16443  16444  704  16445 0
 16442  16443  16444  704 -16446 0
 16442  16443  16444  704  16447 0

c  -1-1 --> -2
c    ( b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧  b^{44, 16}_0 ∧ -p_704) -> ( b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0)
c  in CNF:
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨  b^{44, 17}_2
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨  b^{44, 17}_1
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨  p_704 ∨ -b^{44, 17}_0
c  in DIMACS:
-16442  16443 -16444  704  16445 0
-16442  16443 -16444  704  16446 0
-16442  16443 -16444  704 -16447 0

c  -2-1 --> break 
c    ( b^{44, 16}_2 ∧  b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨  b^{44, 16}_0 ∨  p_704 ∨ break
c  in DIMACS:
-16442 -16443  16444  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 16}_2 ∧ -b^{44, 16}_1 ∧ -b^{44, 16}_0 ∧ true) 
c  in CNF:
c    -b^{44, 16}_2 ∨  b^{44, 16}_1 ∨  b^{44, 16}_0 ∨ false 
c  in DIMACS:
-16442  16443  16444  0

c  3 does not represent an automaton state.
c    -(-b^{44, 16}_2 ∧  b^{44, 16}_1 ∧  b^{44, 16}_0 ∧ true) 
c  in CNF:
c     b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ false 
c  in DIMACS:
 16442 -16443 -16444  0
c  -3 does not represent an automaton state.
c    -( b^{44, 16}_2 ∧  b^{44, 16}_1 ∧  b^{44, 16}_0 ∧ true) 
c  in CNF:
c    -b^{44, 16}_2 ∨ -b^{44, 16}_1 ∨ -b^{44, 16}_0 ∨ false 
c  in DIMACS:
-16442 -16443 -16444  0

c i = 17
c  -2+1 --> -1
c    ( b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧  p_748) -> ( b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0)
c  in CNF:
c    -b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨  b^{44, 18}_2
c    -b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_1
c    -b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨  b^{44, 18}_0
c  in DIMACS:
-16445 -16446  16447 -748  16448 0
-16445 -16446  16447 -748 -16449 0
-16445 -16446  16447 -748  16450 0

c  -1+1 --> 0
c    ( b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0 ∧  p_748) -> (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧ -b^{44, 18}_0)
c  in CNF:
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_2
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_1
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_0
c  in DIMACS:
-16445  16446 -16447 -748 -16448 0
-16445  16446 -16447 -748 -16449 0
-16445  16446 -16447 -748 -16450 0

c  0+1 --> 1
c    (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧  p_748) -> (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0)
c  in CNF:
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_2
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_1
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨  b^{44, 18}_0
c  in DIMACS:
 16445  16446  16447 -748 -16448 0
 16445  16446  16447 -748 -16449 0
 16445  16446  16447 -748  16450 0

c  1+1 --> 2
c    (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0 ∧  p_748) -> (-b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0)
c  in CNF:
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_2
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨  b^{44, 18}_1
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ -p_748 ∨ -b^{44, 18}_0
c  in DIMACS:
 16445  16446 -16447 -748 -16448 0
 16445  16446 -16447 -748  16449 0
 16445  16446 -16447 -748 -16450 0

c  2+1 --> break 
c    (-b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧  p_748) -> break
c  in CNF:
c     b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 16445 -16446  16447 -748 1162 0


c  2-1 --> 1
c    (-b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧ -p_748) -> (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0)
c  in CNF:
c     b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_2
c     b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_1
c     b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨  b^{44, 18}_0
c  in DIMACS:
 16445 -16446  16447  748 -16448 0
 16445 -16446  16447  748 -16449 0
 16445 -16446  16447  748  16450 0

c  1-1 --> 0
c    (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0 ∧ -p_748) -> (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧ -b^{44, 18}_0)
c  in CNF:
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_2
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_1
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_0
c  in DIMACS:
 16445  16446 -16447  748 -16448 0
 16445  16446 -16447  748 -16449 0
 16445  16446 -16447  748 -16450 0

c  0-1 --> -1
c    (-b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧ -p_748) -> ( b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0)
c  in CNF:
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨  b^{44, 18}_2
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_1
c     b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨  b^{44, 18}_0
c  in DIMACS:
 16445  16446  16447  748  16448 0
 16445  16446  16447  748 -16449 0
 16445  16446  16447  748  16450 0

c  -1-1 --> -2
c    ( b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧  b^{44, 17}_0 ∧ -p_748) -> ( b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0)
c  in CNF:
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨  b^{44, 18}_2
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨  b^{44, 18}_1
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨  p_748 ∨ -b^{44, 18}_0
c  in DIMACS:
-16445  16446 -16447  748  16448 0
-16445  16446 -16447  748  16449 0
-16445  16446 -16447  748 -16450 0

c  -2-1 --> break 
c    ( b^{44, 17}_2 ∧  b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨  b^{44, 17}_0 ∨  p_748 ∨ break
c  in DIMACS:
-16445 -16446  16447  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 17}_2 ∧ -b^{44, 17}_1 ∧ -b^{44, 17}_0 ∧ true) 
c  in CNF:
c    -b^{44, 17}_2 ∨  b^{44, 17}_1 ∨  b^{44, 17}_0 ∨ false 
c  in DIMACS:
-16445  16446  16447  0

c  3 does not represent an automaton state.
c    -(-b^{44, 17}_2 ∧  b^{44, 17}_1 ∧  b^{44, 17}_0 ∧ true) 
c  in CNF:
c     b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ false 
c  in DIMACS:
 16445 -16446 -16447  0
c  -3 does not represent an automaton state.
c    -( b^{44, 17}_2 ∧  b^{44, 17}_1 ∧  b^{44, 17}_0 ∧ true) 
c  in CNF:
c    -b^{44, 17}_2 ∨ -b^{44, 17}_1 ∨ -b^{44, 17}_0 ∨ false 
c  in DIMACS:
-16445 -16446 -16447  0

c i = 18
c  -2+1 --> -1
c    ( b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧  p_792) -> ( b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0)
c  in CNF:
c    -b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨  b^{44, 19}_2
c    -b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_1
c    -b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨  b^{44, 19}_0
c  in DIMACS:
-16448 -16449  16450 -792  16451 0
-16448 -16449  16450 -792 -16452 0
-16448 -16449  16450 -792  16453 0

c  -1+1 --> 0
c    ( b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0 ∧  p_792) -> (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧ -b^{44, 19}_0)
c  in CNF:
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_2
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_1
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_0
c  in DIMACS:
-16448  16449 -16450 -792 -16451 0
-16448  16449 -16450 -792 -16452 0
-16448  16449 -16450 -792 -16453 0

c  0+1 --> 1
c    (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧  p_792) -> (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0)
c  in CNF:
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_2
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_1
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨  b^{44, 19}_0
c  in DIMACS:
 16448  16449  16450 -792 -16451 0
 16448  16449  16450 -792 -16452 0
 16448  16449  16450 -792  16453 0

c  1+1 --> 2
c    (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0 ∧  p_792) -> (-b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0)
c  in CNF:
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_2
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨  b^{44, 19}_1
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ -p_792 ∨ -b^{44, 19}_0
c  in DIMACS:
 16448  16449 -16450 -792 -16451 0
 16448  16449 -16450 -792  16452 0
 16448  16449 -16450 -792 -16453 0

c  2+1 --> break 
c    (-b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧  p_792) -> break
c  in CNF:
c     b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 16448 -16449  16450 -792 1162 0


c  2-1 --> 1
c    (-b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧ -p_792) -> (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0)
c  in CNF:
c     b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_2
c     b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_1
c     b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨  b^{44, 19}_0
c  in DIMACS:
 16448 -16449  16450  792 -16451 0
 16448 -16449  16450  792 -16452 0
 16448 -16449  16450  792  16453 0

c  1-1 --> 0
c    (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0 ∧ -p_792) -> (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧ -b^{44, 19}_0)
c  in CNF:
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_2
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_1
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_0
c  in DIMACS:
 16448  16449 -16450  792 -16451 0
 16448  16449 -16450  792 -16452 0
 16448  16449 -16450  792 -16453 0

c  0-1 --> -1
c    (-b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧ -p_792) -> ( b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0)
c  in CNF:
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨  b^{44, 19}_2
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_1
c     b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨  b^{44, 19}_0
c  in DIMACS:
 16448  16449  16450  792  16451 0
 16448  16449  16450  792 -16452 0
 16448  16449  16450  792  16453 0

c  -1-1 --> -2
c    ( b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧  b^{44, 18}_0 ∧ -p_792) -> ( b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0)
c  in CNF:
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨  b^{44, 19}_2
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨  b^{44, 19}_1
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨  p_792 ∨ -b^{44, 19}_0
c  in DIMACS:
-16448  16449 -16450  792  16451 0
-16448  16449 -16450  792  16452 0
-16448  16449 -16450  792 -16453 0

c  -2-1 --> break 
c    ( b^{44, 18}_2 ∧  b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨  b^{44, 18}_0 ∨  p_792 ∨ break
c  in DIMACS:
-16448 -16449  16450  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 18}_2 ∧ -b^{44, 18}_1 ∧ -b^{44, 18}_0 ∧ true) 
c  in CNF:
c    -b^{44, 18}_2 ∨  b^{44, 18}_1 ∨  b^{44, 18}_0 ∨ false 
c  in DIMACS:
-16448  16449  16450  0

c  3 does not represent an automaton state.
c    -(-b^{44, 18}_2 ∧  b^{44, 18}_1 ∧  b^{44, 18}_0 ∧ true) 
c  in CNF:
c     b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ false 
c  in DIMACS:
 16448 -16449 -16450  0
c  -3 does not represent an automaton state.
c    -( b^{44, 18}_2 ∧  b^{44, 18}_1 ∧  b^{44, 18}_0 ∧ true) 
c  in CNF:
c    -b^{44, 18}_2 ∨ -b^{44, 18}_1 ∨ -b^{44, 18}_0 ∨ false 
c  in DIMACS:
-16448 -16449 -16450  0

c i = 19
c  -2+1 --> -1
c    ( b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧  p_836) -> ( b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0)
c  in CNF:
c    -b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨  b^{44, 20}_2
c    -b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_1
c    -b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨  b^{44, 20}_0
c  in DIMACS:
-16451 -16452  16453 -836  16454 0
-16451 -16452  16453 -836 -16455 0
-16451 -16452  16453 -836  16456 0

c  -1+1 --> 0
c    ( b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0 ∧  p_836) -> (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧ -b^{44, 20}_0)
c  in CNF:
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_2
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_1
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_0
c  in DIMACS:
-16451  16452 -16453 -836 -16454 0
-16451  16452 -16453 -836 -16455 0
-16451  16452 -16453 -836 -16456 0

c  0+1 --> 1
c    (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧  p_836) -> (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0)
c  in CNF:
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_2
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_1
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨  b^{44, 20}_0
c  in DIMACS:
 16451  16452  16453 -836 -16454 0
 16451  16452  16453 -836 -16455 0
 16451  16452  16453 -836  16456 0

c  1+1 --> 2
c    (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0 ∧  p_836) -> (-b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0)
c  in CNF:
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_2
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨  b^{44, 20}_1
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ -p_836 ∨ -b^{44, 20}_0
c  in DIMACS:
 16451  16452 -16453 -836 -16454 0
 16451  16452 -16453 -836  16455 0
 16451  16452 -16453 -836 -16456 0

c  2+1 --> break 
c    (-b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧  p_836) -> break
c  in CNF:
c     b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 16451 -16452  16453 -836 1162 0


c  2-1 --> 1
c    (-b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧ -p_836) -> (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0)
c  in CNF:
c     b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_2
c     b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_1
c     b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨  b^{44, 20}_0
c  in DIMACS:
 16451 -16452  16453  836 -16454 0
 16451 -16452  16453  836 -16455 0
 16451 -16452  16453  836  16456 0

c  1-1 --> 0
c    (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0 ∧ -p_836) -> (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧ -b^{44, 20}_0)
c  in CNF:
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_2
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_1
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_0
c  in DIMACS:
 16451  16452 -16453  836 -16454 0
 16451  16452 -16453  836 -16455 0
 16451  16452 -16453  836 -16456 0

c  0-1 --> -1
c    (-b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧ -p_836) -> ( b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0)
c  in CNF:
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨  b^{44, 20}_2
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_1
c     b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨  b^{44, 20}_0
c  in DIMACS:
 16451  16452  16453  836  16454 0
 16451  16452  16453  836 -16455 0
 16451  16452  16453  836  16456 0

c  -1-1 --> -2
c    ( b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧  b^{44, 19}_0 ∧ -p_836) -> ( b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0)
c  in CNF:
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨  b^{44, 20}_2
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨  b^{44, 20}_1
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨  p_836 ∨ -b^{44, 20}_0
c  in DIMACS:
-16451  16452 -16453  836  16454 0
-16451  16452 -16453  836  16455 0
-16451  16452 -16453  836 -16456 0

c  -2-1 --> break 
c    ( b^{44, 19}_2 ∧  b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨  b^{44, 19}_0 ∨  p_836 ∨ break
c  in DIMACS:
-16451 -16452  16453  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 19}_2 ∧ -b^{44, 19}_1 ∧ -b^{44, 19}_0 ∧ true) 
c  in CNF:
c    -b^{44, 19}_2 ∨  b^{44, 19}_1 ∨  b^{44, 19}_0 ∨ false 
c  in DIMACS:
-16451  16452  16453  0

c  3 does not represent an automaton state.
c    -(-b^{44, 19}_2 ∧  b^{44, 19}_1 ∧  b^{44, 19}_0 ∧ true) 
c  in CNF:
c     b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ false 
c  in DIMACS:
 16451 -16452 -16453  0
c  -3 does not represent an automaton state.
c    -( b^{44, 19}_2 ∧  b^{44, 19}_1 ∧  b^{44, 19}_0 ∧ true) 
c  in CNF:
c    -b^{44, 19}_2 ∨ -b^{44, 19}_1 ∨ -b^{44, 19}_0 ∨ false 
c  in DIMACS:
-16451 -16452 -16453  0

c i = 20
c  -2+1 --> -1
c    ( b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧  p_880) -> ( b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0)
c  in CNF:
c    -b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨  b^{44, 21}_2
c    -b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_1
c    -b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨  b^{44, 21}_0
c  in DIMACS:
-16454 -16455  16456 -880  16457 0
-16454 -16455  16456 -880 -16458 0
-16454 -16455  16456 -880  16459 0

c  -1+1 --> 0
c    ( b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0 ∧  p_880) -> (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧ -b^{44, 21}_0)
c  in CNF:
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_2
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_1
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_0
c  in DIMACS:
-16454  16455 -16456 -880 -16457 0
-16454  16455 -16456 -880 -16458 0
-16454  16455 -16456 -880 -16459 0

c  0+1 --> 1
c    (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧  p_880) -> (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0)
c  in CNF:
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_2
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_1
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨  b^{44, 21}_0
c  in DIMACS:
 16454  16455  16456 -880 -16457 0
 16454  16455  16456 -880 -16458 0
 16454  16455  16456 -880  16459 0

c  1+1 --> 2
c    (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0 ∧  p_880) -> (-b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0)
c  in CNF:
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_2
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨  b^{44, 21}_1
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ -p_880 ∨ -b^{44, 21}_0
c  in DIMACS:
 16454  16455 -16456 -880 -16457 0
 16454  16455 -16456 -880  16458 0
 16454  16455 -16456 -880 -16459 0

c  2+1 --> break 
c    (-b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧  p_880) -> break
c  in CNF:
c     b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 16454 -16455  16456 -880 1162 0


c  2-1 --> 1
c    (-b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧ -p_880) -> (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0)
c  in CNF:
c     b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_2
c     b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_1
c     b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨  b^{44, 21}_0
c  in DIMACS:
 16454 -16455  16456  880 -16457 0
 16454 -16455  16456  880 -16458 0
 16454 -16455  16456  880  16459 0

c  1-1 --> 0
c    (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0 ∧ -p_880) -> (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧ -b^{44, 21}_0)
c  in CNF:
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_2
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_1
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_0
c  in DIMACS:
 16454  16455 -16456  880 -16457 0
 16454  16455 -16456  880 -16458 0
 16454  16455 -16456  880 -16459 0

c  0-1 --> -1
c    (-b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧ -p_880) -> ( b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0)
c  in CNF:
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨  b^{44, 21}_2
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_1
c     b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨  b^{44, 21}_0
c  in DIMACS:
 16454  16455  16456  880  16457 0
 16454  16455  16456  880 -16458 0
 16454  16455  16456  880  16459 0

c  -1-1 --> -2
c    ( b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧  b^{44, 20}_0 ∧ -p_880) -> ( b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0)
c  in CNF:
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨  b^{44, 21}_2
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨  b^{44, 21}_1
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨  p_880 ∨ -b^{44, 21}_0
c  in DIMACS:
-16454  16455 -16456  880  16457 0
-16454  16455 -16456  880  16458 0
-16454  16455 -16456  880 -16459 0

c  -2-1 --> break 
c    ( b^{44, 20}_2 ∧  b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨  b^{44, 20}_0 ∨  p_880 ∨ break
c  in DIMACS:
-16454 -16455  16456  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 20}_2 ∧ -b^{44, 20}_1 ∧ -b^{44, 20}_0 ∧ true) 
c  in CNF:
c    -b^{44, 20}_2 ∨  b^{44, 20}_1 ∨  b^{44, 20}_0 ∨ false 
c  in DIMACS:
-16454  16455  16456  0

c  3 does not represent an automaton state.
c    -(-b^{44, 20}_2 ∧  b^{44, 20}_1 ∧  b^{44, 20}_0 ∧ true) 
c  in CNF:
c     b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ false 
c  in DIMACS:
 16454 -16455 -16456  0
c  -3 does not represent an automaton state.
c    -( b^{44, 20}_2 ∧  b^{44, 20}_1 ∧  b^{44, 20}_0 ∧ true) 
c  in CNF:
c    -b^{44, 20}_2 ∨ -b^{44, 20}_1 ∨ -b^{44, 20}_0 ∨ false 
c  in DIMACS:
-16454 -16455 -16456  0

c i = 21
c  -2+1 --> -1
c    ( b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧  p_924) -> ( b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0)
c  in CNF:
c    -b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨  b^{44, 22}_2
c    -b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_1
c    -b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨  b^{44, 22}_0
c  in DIMACS:
-16457 -16458  16459 -924  16460 0
-16457 -16458  16459 -924 -16461 0
-16457 -16458  16459 -924  16462 0

c  -1+1 --> 0
c    ( b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0 ∧  p_924) -> (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧ -b^{44, 22}_0)
c  in CNF:
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_2
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_1
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_0
c  in DIMACS:
-16457  16458 -16459 -924 -16460 0
-16457  16458 -16459 -924 -16461 0
-16457  16458 -16459 -924 -16462 0

c  0+1 --> 1
c    (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧  p_924) -> (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0)
c  in CNF:
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_2
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_1
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨  b^{44, 22}_0
c  in DIMACS:
 16457  16458  16459 -924 -16460 0
 16457  16458  16459 -924 -16461 0
 16457  16458  16459 -924  16462 0

c  1+1 --> 2
c    (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0 ∧  p_924) -> (-b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0)
c  in CNF:
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_2
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨  b^{44, 22}_1
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ -p_924 ∨ -b^{44, 22}_0
c  in DIMACS:
 16457  16458 -16459 -924 -16460 0
 16457  16458 -16459 -924  16461 0
 16457  16458 -16459 -924 -16462 0

c  2+1 --> break 
c    (-b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧  p_924) -> break
c  in CNF:
c     b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 16457 -16458  16459 -924 1162 0


c  2-1 --> 1
c    (-b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧ -p_924) -> (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0)
c  in CNF:
c     b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_2
c     b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_1
c     b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨  b^{44, 22}_0
c  in DIMACS:
 16457 -16458  16459  924 -16460 0
 16457 -16458  16459  924 -16461 0
 16457 -16458  16459  924  16462 0

c  1-1 --> 0
c    (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0 ∧ -p_924) -> (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧ -b^{44, 22}_0)
c  in CNF:
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_2
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_1
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_0
c  in DIMACS:
 16457  16458 -16459  924 -16460 0
 16457  16458 -16459  924 -16461 0
 16457  16458 -16459  924 -16462 0

c  0-1 --> -1
c    (-b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧ -p_924) -> ( b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0)
c  in CNF:
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨  b^{44, 22}_2
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_1
c     b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨  b^{44, 22}_0
c  in DIMACS:
 16457  16458  16459  924  16460 0
 16457  16458  16459  924 -16461 0
 16457  16458  16459  924  16462 0

c  -1-1 --> -2
c    ( b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧  b^{44, 21}_0 ∧ -p_924) -> ( b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0)
c  in CNF:
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨  b^{44, 22}_2
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨  b^{44, 22}_1
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨  p_924 ∨ -b^{44, 22}_0
c  in DIMACS:
-16457  16458 -16459  924  16460 0
-16457  16458 -16459  924  16461 0
-16457  16458 -16459  924 -16462 0

c  -2-1 --> break 
c    ( b^{44, 21}_2 ∧  b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨  b^{44, 21}_0 ∨  p_924 ∨ break
c  in DIMACS:
-16457 -16458  16459  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 21}_2 ∧ -b^{44, 21}_1 ∧ -b^{44, 21}_0 ∧ true) 
c  in CNF:
c    -b^{44, 21}_2 ∨  b^{44, 21}_1 ∨  b^{44, 21}_0 ∨ false 
c  in DIMACS:
-16457  16458  16459  0

c  3 does not represent an automaton state.
c    -(-b^{44, 21}_2 ∧  b^{44, 21}_1 ∧  b^{44, 21}_0 ∧ true) 
c  in CNF:
c     b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ false 
c  in DIMACS:
 16457 -16458 -16459  0
c  -3 does not represent an automaton state.
c    -( b^{44, 21}_2 ∧  b^{44, 21}_1 ∧  b^{44, 21}_0 ∧ true) 
c  in CNF:
c    -b^{44, 21}_2 ∨ -b^{44, 21}_1 ∨ -b^{44, 21}_0 ∨ false 
c  in DIMACS:
-16457 -16458 -16459  0

c i = 22
c  -2+1 --> -1
c    ( b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧  p_968) -> ( b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0)
c  in CNF:
c    -b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨  b^{44, 23}_2
c    -b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_1
c    -b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨  b^{44, 23}_0
c  in DIMACS:
-16460 -16461  16462 -968  16463 0
-16460 -16461  16462 -968 -16464 0
-16460 -16461  16462 -968  16465 0

c  -1+1 --> 0
c    ( b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0 ∧  p_968) -> (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧ -b^{44, 23}_0)
c  in CNF:
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_2
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_1
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_0
c  in DIMACS:
-16460  16461 -16462 -968 -16463 0
-16460  16461 -16462 -968 -16464 0
-16460  16461 -16462 -968 -16465 0

c  0+1 --> 1
c    (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧  p_968) -> (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0)
c  in CNF:
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_2
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_1
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨  b^{44, 23}_0
c  in DIMACS:
 16460  16461  16462 -968 -16463 0
 16460  16461  16462 -968 -16464 0
 16460  16461  16462 -968  16465 0

c  1+1 --> 2
c    (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0 ∧  p_968) -> (-b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0)
c  in CNF:
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_2
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨  b^{44, 23}_1
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ -p_968 ∨ -b^{44, 23}_0
c  in DIMACS:
 16460  16461 -16462 -968 -16463 0
 16460  16461 -16462 -968  16464 0
 16460  16461 -16462 -968 -16465 0

c  2+1 --> break 
c    (-b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧  p_968) -> break
c  in CNF:
c     b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 16460 -16461  16462 -968 1162 0


c  2-1 --> 1
c    (-b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧ -p_968) -> (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0)
c  in CNF:
c     b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_2
c     b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_1
c     b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨  b^{44, 23}_0
c  in DIMACS:
 16460 -16461  16462  968 -16463 0
 16460 -16461  16462  968 -16464 0
 16460 -16461  16462  968  16465 0

c  1-1 --> 0
c    (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0 ∧ -p_968) -> (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧ -b^{44, 23}_0)
c  in CNF:
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_2
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_1
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_0
c  in DIMACS:
 16460  16461 -16462  968 -16463 0
 16460  16461 -16462  968 -16464 0
 16460  16461 -16462  968 -16465 0

c  0-1 --> -1
c    (-b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧ -p_968) -> ( b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0)
c  in CNF:
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨  b^{44, 23}_2
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_1
c     b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨  b^{44, 23}_0
c  in DIMACS:
 16460  16461  16462  968  16463 0
 16460  16461  16462  968 -16464 0
 16460  16461  16462  968  16465 0

c  -1-1 --> -2
c    ( b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧  b^{44, 22}_0 ∧ -p_968) -> ( b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0)
c  in CNF:
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨  b^{44, 23}_2
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨  b^{44, 23}_1
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨  p_968 ∨ -b^{44, 23}_0
c  in DIMACS:
-16460  16461 -16462  968  16463 0
-16460  16461 -16462  968  16464 0
-16460  16461 -16462  968 -16465 0

c  -2-1 --> break 
c    ( b^{44, 22}_2 ∧  b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨  b^{44, 22}_0 ∨  p_968 ∨ break
c  in DIMACS:
-16460 -16461  16462  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 22}_2 ∧ -b^{44, 22}_1 ∧ -b^{44, 22}_0 ∧ true) 
c  in CNF:
c    -b^{44, 22}_2 ∨  b^{44, 22}_1 ∨  b^{44, 22}_0 ∨ false 
c  in DIMACS:
-16460  16461  16462  0

c  3 does not represent an automaton state.
c    -(-b^{44, 22}_2 ∧  b^{44, 22}_1 ∧  b^{44, 22}_0 ∧ true) 
c  in CNF:
c     b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ false 
c  in DIMACS:
 16460 -16461 -16462  0
c  -3 does not represent an automaton state.
c    -( b^{44, 22}_2 ∧  b^{44, 22}_1 ∧  b^{44, 22}_0 ∧ true) 
c  in CNF:
c    -b^{44, 22}_2 ∨ -b^{44, 22}_1 ∨ -b^{44, 22}_0 ∨ false 
c  in DIMACS:
-16460 -16461 -16462  0

c i = 23
c  -2+1 --> -1
c    ( b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧  p_1012) -> ( b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0)
c  in CNF:
c    -b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨  b^{44, 24}_2
c    -b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_1
c    -b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨  b^{44, 24}_0
c  in DIMACS:
-16463 -16464  16465 -1012  16466 0
-16463 -16464  16465 -1012 -16467 0
-16463 -16464  16465 -1012  16468 0

c  -1+1 --> 0
c    ( b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0 ∧  p_1012) -> (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧ -b^{44, 24}_0)
c  in CNF:
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_2
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_1
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_0
c  in DIMACS:
-16463  16464 -16465 -1012 -16466 0
-16463  16464 -16465 -1012 -16467 0
-16463  16464 -16465 -1012 -16468 0

c  0+1 --> 1
c    (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧  p_1012) -> (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0)
c  in CNF:
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_2
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_1
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨  b^{44, 24}_0
c  in DIMACS:
 16463  16464  16465 -1012 -16466 0
 16463  16464  16465 -1012 -16467 0
 16463  16464  16465 -1012  16468 0

c  1+1 --> 2
c    (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0 ∧  p_1012) -> (-b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0)
c  in CNF:
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_2
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨  b^{44, 24}_1
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ -p_1012 ∨ -b^{44, 24}_0
c  in DIMACS:
 16463  16464 -16465 -1012 -16466 0
 16463  16464 -16465 -1012  16467 0
 16463  16464 -16465 -1012 -16468 0

c  2+1 --> break 
c    (-b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 16463 -16464  16465 -1012 1162 0


c  2-1 --> 1
c    (-b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧ -p_1012) -> (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0)
c  in CNF:
c     b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_2
c     b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_1
c     b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨  b^{44, 24}_0
c  in DIMACS:
 16463 -16464  16465  1012 -16466 0
 16463 -16464  16465  1012 -16467 0
 16463 -16464  16465  1012  16468 0

c  1-1 --> 0
c    (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0 ∧ -p_1012) -> (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧ -b^{44, 24}_0)
c  in CNF:
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_2
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_1
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_0
c  in DIMACS:
 16463  16464 -16465  1012 -16466 0
 16463  16464 -16465  1012 -16467 0
 16463  16464 -16465  1012 -16468 0

c  0-1 --> -1
c    (-b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧ -p_1012) -> ( b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0)
c  in CNF:
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨  b^{44, 24}_2
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_1
c     b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨  b^{44, 24}_0
c  in DIMACS:
 16463  16464  16465  1012  16466 0
 16463  16464  16465  1012 -16467 0
 16463  16464  16465  1012  16468 0

c  -1-1 --> -2
c    ( b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧  b^{44, 23}_0 ∧ -p_1012) -> ( b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0)
c  in CNF:
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨  b^{44, 24}_2
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨  b^{44, 24}_1
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨  p_1012 ∨ -b^{44, 24}_0
c  in DIMACS:
-16463  16464 -16465  1012  16466 0
-16463  16464 -16465  1012  16467 0
-16463  16464 -16465  1012 -16468 0

c  -2-1 --> break 
c    ( b^{44, 23}_2 ∧  b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨  b^{44, 23}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-16463 -16464  16465  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 23}_2 ∧ -b^{44, 23}_1 ∧ -b^{44, 23}_0 ∧ true) 
c  in CNF:
c    -b^{44, 23}_2 ∨  b^{44, 23}_1 ∨  b^{44, 23}_0 ∨ false 
c  in DIMACS:
-16463  16464  16465  0

c  3 does not represent an automaton state.
c    -(-b^{44, 23}_2 ∧  b^{44, 23}_1 ∧  b^{44, 23}_0 ∧ true) 
c  in CNF:
c     b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ false 
c  in DIMACS:
 16463 -16464 -16465  0
c  -3 does not represent an automaton state.
c    -( b^{44, 23}_2 ∧  b^{44, 23}_1 ∧  b^{44, 23}_0 ∧ true) 
c  in CNF:
c    -b^{44, 23}_2 ∨ -b^{44, 23}_1 ∨ -b^{44, 23}_0 ∨ false 
c  in DIMACS:
-16463 -16464 -16465  0

c i = 24
c  -2+1 --> -1
c    ( b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧  p_1056) -> ( b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0)
c  in CNF:
c    -b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨  b^{44, 25}_2
c    -b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_1
c    -b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨  b^{44, 25}_0
c  in DIMACS:
-16466 -16467  16468 -1056  16469 0
-16466 -16467  16468 -1056 -16470 0
-16466 -16467  16468 -1056  16471 0

c  -1+1 --> 0
c    ( b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0 ∧  p_1056) -> (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧ -b^{44, 25}_0)
c  in CNF:
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_2
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_1
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_0
c  in DIMACS:
-16466  16467 -16468 -1056 -16469 0
-16466  16467 -16468 -1056 -16470 0
-16466  16467 -16468 -1056 -16471 0

c  0+1 --> 1
c    (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧  p_1056) -> (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0)
c  in CNF:
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_2
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_1
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨  b^{44, 25}_0
c  in DIMACS:
 16466  16467  16468 -1056 -16469 0
 16466  16467  16468 -1056 -16470 0
 16466  16467  16468 -1056  16471 0

c  1+1 --> 2
c    (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0 ∧  p_1056) -> (-b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0)
c  in CNF:
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_2
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨  b^{44, 25}_1
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ -p_1056 ∨ -b^{44, 25}_0
c  in DIMACS:
 16466  16467 -16468 -1056 -16469 0
 16466  16467 -16468 -1056  16470 0
 16466  16467 -16468 -1056 -16471 0

c  2+1 --> break 
c    (-b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 16466 -16467  16468 -1056 1162 0


c  2-1 --> 1
c    (-b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧ -p_1056) -> (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0)
c  in CNF:
c     b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_2
c     b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_1
c     b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨  b^{44, 25}_0
c  in DIMACS:
 16466 -16467  16468  1056 -16469 0
 16466 -16467  16468  1056 -16470 0
 16466 -16467  16468  1056  16471 0

c  1-1 --> 0
c    (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0 ∧ -p_1056) -> (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧ -b^{44, 25}_0)
c  in CNF:
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_2
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_1
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_0
c  in DIMACS:
 16466  16467 -16468  1056 -16469 0
 16466  16467 -16468  1056 -16470 0
 16466  16467 -16468  1056 -16471 0

c  0-1 --> -1
c    (-b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧ -p_1056) -> ( b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0)
c  in CNF:
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨  b^{44, 25}_2
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_1
c     b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨  b^{44, 25}_0
c  in DIMACS:
 16466  16467  16468  1056  16469 0
 16466  16467  16468  1056 -16470 0
 16466  16467  16468  1056  16471 0

c  -1-1 --> -2
c    ( b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧  b^{44, 24}_0 ∧ -p_1056) -> ( b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0)
c  in CNF:
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨  b^{44, 25}_2
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨  b^{44, 25}_1
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨  p_1056 ∨ -b^{44, 25}_0
c  in DIMACS:
-16466  16467 -16468  1056  16469 0
-16466  16467 -16468  1056  16470 0
-16466  16467 -16468  1056 -16471 0

c  -2-1 --> break 
c    ( b^{44, 24}_2 ∧  b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨  b^{44, 24}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-16466 -16467  16468  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 24}_2 ∧ -b^{44, 24}_1 ∧ -b^{44, 24}_0 ∧ true) 
c  in CNF:
c    -b^{44, 24}_2 ∨  b^{44, 24}_1 ∨  b^{44, 24}_0 ∨ false 
c  in DIMACS:
-16466  16467  16468  0

c  3 does not represent an automaton state.
c    -(-b^{44, 24}_2 ∧  b^{44, 24}_1 ∧  b^{44, 24}_0 ∧ true) 
c  in CNF:
c     b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ false 
c  in DIMACS:
 16466 -16467 -16468  0
c  -3 does not represent an automaton state.
c    -( b^{44, 24}_2 ∧  b^{44, 24}_1 ∧  b^{44, 24}_0 ∧ true) 
c  in CNF:
c    -b^{44, 24}_2 ∨ -b^{44, 24}_1 ∨ -b^{44, 24}_0 ∨ false 
c  in DIMACS:
-16466 -16467 -16468  0

c i = 25
c  -2+1 --> -1
c    ( b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧  p_1100) -> ( b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0)
c  in CNF:
c    -b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨  b^{44, 26}_2
c    -b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_1
c    -b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨  b^{44, 26}_0
c  in DIMACS:
-16469 -16470  16471 -1100  16472 0
-16469 -16470  16471 -1100 -16473 0
-16469 -16470  16471 -1100  16474 0

c  -1+1 --> 0
c    ( b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0 ∧  p_1100) -> (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧ -b^{44, 26}_0)
c  in CNF:
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_2
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_1
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_0
c  in DIMACS:
-16469  16470 -16471 -1100 -16472 0
-16469  16470 -16471 -1100 -16473 0
-16469  16470 -16471 -1100 -16474 0

c  0+1 --> 1
c    (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧  p_1100) -> (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0)
c  in CNF:
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_2
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_1
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨  b^{44, 26}_0
c  in DIMACS:
 16469  16470  16471 -1100 -16472 0
 16469  16470  16471 -1100 -16473 0
 16469  16470  16471 -1100  16474 0

c  1+1 --> 2
c    (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0 ∧  p_1100) -> (-b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0)
c  in CNF:
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_2
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨  b^{44, 26}_1
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ -p_1100 ∨ -b^{44, 26}_0
c  in DIMACS:
 16469  16470 -16471 -1100 -16472 0
 16469  16470 -16471 -1100  16473 0
 16469  16470 -16471 -1100 -16474 0

c  2+1 --> break 
c    (-b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 16469 -16470  16471 -1100 1162 0


c  2-1 --> 1
c    (-b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧ -p_1100) -> (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0)
c  in CNF:
c     b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_2
c     b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_1
c     b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨  b^{44, 26}_0
c  in DIMACS:
 16469 -16470  16471  1100 -16472 0
 16469 -16470  16471  1100 -16473 0
 16469 -16470  16471  1100  16474 0

c  1-1 --> 0
c    (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0 ∧ -p_1100) -> (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧ -b^{44, 26}_0)
c  in CNF:
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_2
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_1
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_0
c  in DIMACS:
 16469  16470 -16471  1100 -16472 0
 16469  16470 -16471  1100 -16473 0
 16469  16470 -16471  1100 -16474 0

c  0-1 --> -1
c    (-b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧ -p_1100) -> ( b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0)
c  in CNF:
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨  b^{44, 26}_2
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_1
c     b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨  b^{44, 26}_0
c  in DIMACS:
 16469  16470  16471  1100  16472 0
 16469  16470  16471  1100 -16473 0
 16469  16470  16471  1100  16474 0

c  -1-1 --> -2
c    ( b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧  b^{44, 25}_0 ∧ -p_1100) -> ( b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0)
c  in CNF:
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨  b^{44, 26}_2
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨  b^{44, 26}_1
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨  p_1100 ∨ -b^{44, 26}_0
c  in DIMACS:
-16469  16470 -16471  1100  16472 0
-16469  16470 -16471  1100  16473 0
-16469  16470 -16471  1100 -16474 0

c  -2-1 --> break 
c    ( b^{44, 25}_2 ∧  b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨  b^{44, 25}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-16469 -16470  16471  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 25}_2 ∧ -b^{44, 25}_1 ∧ -b^{44, 25}_0 ∧ true) 
c  in CNF:
c    -b^{44, 25}_2 ∨  b^{44, 25}_1 ∨  b^{44, 25}_0 ∨ false 
c  in DIMACS:
-16469  16470  16471  0

c  3 does not represent an automaton state.
c    -(-b^{44, 25}_2 ∧  b^{44, 25}_1 ∧  b^{44, 25}_0 ∧ true) 
c  in CNF:
c     b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ false 
c  in DIMACS:
 16469 -16470 -16471  0
c  -3 does not represent an automaton state.
c    -( b^{44, 25}_2 ∧  b^{44, 25}_1 ∧  b^{44, 25}_0 ∧ true) 
c  in CNF:
c    -b^{44, 25}_2 ∨ -b^{44, 25}_1 ∨ -b^{44, 25}_0 ∨ false 
c  in DIMACS:
-16469 -16470 -16471  0

c i = 26
c  -2+1 --> -1
c    ( b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧  p_1144) -> ( b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧  b^{44, 27}_0)
c  in CNF:
c    -b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨  b^{44, 27}_2
c    -b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_1
c    -b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨  b^{44, 27}_0
c  in DIMACS:
-16472 -16473  16474 -1144  16475 0
-16472 -16473  16474 -1144 -16476 0
-16472 -16473  16474 -1144  16477 0

c  -1+1 --> 0
c    ( b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0 ∧  p_1144) -> (-b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧ -b^{44, 27}_0)
c  in CNF:
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_2
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_1
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_0
c  in DIMACS:
-16472  16473 -16474 -1144 -16475 0
-16472  16473 -16474 -1144 -16476 0
-16472  16473 -16474 -1144 -16477 0

c  0+1 --> 1
c    (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧  p_1144) -> (-b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧  b^{44, 27}_0)
c  in CNF:
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_2
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_1
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨  b^{44, 27}_0
c  in DIMACS:
 16472  16473  16474 -1144 -16475 0
 16472  16473  16474 -1144 -16476 0
 16472  16473  16474 -1144  16477 0

c  1+1 --> 2
c    (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0 ∧  p_1144) -> (-b^{44, 27}_2 ∧  b^{44, 27}_1 ∧ -b^{44, 27}_0)
c  in CNF:
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_2
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨  b^{44, 27}_1
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ -p_1144 ∨ -b^{44, 27}_0
c  in DIMACS:
 16472  16473 -16474 -1144 -16475 0
 16472  16473 -16474 -1144  16476 0
 16472  16473 -16474 -1144 -16477 0

c  2+1 --> break 
c    (-b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 16472 -16473  16474 -1144 1162 0


c  2-1 --> 1
c    (-b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧ -p_1144) -> (-b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧  b^{44, 27}_0)
c  in CNF:
c     b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_2
c     b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_1
c     b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨  b^{44, 27}_0
c  in DIMACS:
 16472 -16473  16474  1144 -16475 0
 16472 -16473  16474  1144 -16476 0
 16472 -16473  16474  1144  16477 0

c  1-1 --> 0
c    (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0 ∧ -p_1144) -> (-b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧ -b^{44, 27}_0)
c  in CNF:
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_2
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_1
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_0
c  in DIMACS:
 16472  16473 -16474  1144 -16475 0
 16472  16473 -16474  1144 -16476 0
 16472  16473 -16474  1144 -16477 0

c  0-1 --> -1
c    (-b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧ -p_1144) -> ( b^{44, 27}_2 ∧ -b^{44, 27}_1 ∧  b^{44, 27}_0)
c  in CNF:
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨  b^{44, 27}_2
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_1
c     b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨  b^{44, 27}_0
c  in DIMACS:
 16472  16473  16474  1144  16475 0
 16472  16473  16474  1144 -16476 0
 16472  16473  16474  1144  16477 0

c  -1-1 --> -2
c    ( b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧  b^{44, 26}_0 ∧ -p_1144) -> ( b^{44, 27}_2 ∧  b^{44, 27}_1 ∧ -b^{44, 27}_0)
c  in CNF:
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨  b^{44, 27}_2
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨  b^{44, 27}_1
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨  p_1144 ∨ -b^{44, 27}_0
c  in DIMACS:
-16472  16473 -16474  1144  16475 0
-16472  16473 -16474  1144  16476 0
-16472  16473 -16474  1144 -16477 0

c  -2-1 --> break 
c    ( b^{44, 26}_2 ∧  b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨  b^{44, 26}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-16472 -16473  16474  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{44, 26}_2 ∧ -b^{44, 26}_1 ∧ -b^{44, 26}_0 ∧ true) 
c  in CNF:
c    -b^{44, 26}_2 ∨  b^{44, 26}_1 ∨  b^{44, 26}_0 ∨ false 
c  in DIMACS:
-16472  16473  16474  0

c  3 does not represent an automaton state.
c    -(-b^{44, 26}_2 ∧  b^{44, 26}_1 ∧  b^{44, 26}_0 ∧ true) 
c  in CNF:
c     b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ false 
c  in DIMACS:
 16472 -16473 -16474  0
c  -3 does not represent an automaton state.
c    -( b^{44, 26}_2 ∧  b^{44, 26}_1 ∧  b^{44, 26}_0 ∧ true) 
c  in CNF:
c    -b^{44, 26}_2 ∨ -b^{44, 26}_1 ∨ -b^{44, 26}_0 ∨ false 
c  in DIMACS:
-16472 -16473 -16474  0

c INIT for k = 45
c    -b^{45, 1}_2
c    -b^{45, 1}_1
c    -b^{45, 1}_0
c  in DIMACS:
-16478 0
-16479 0
-16480 0

c Transitions for k = 45
c i = 1
c  -2+1 --> -1
c    ( b^{45, 1}_2 ∧  b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧  p_45) -> ( b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0)
c  in CNF:
c    -b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨  b^{45, 2}_2
c    -b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_1
c    -b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨  b^{45, 2}_0
c  in DIMACS:
-16478 -16479  16480 -45  16481 0
-16478 -16479  16480 -45 -16482 0
-16478 -16479  16480 -45  16483 0

c  -1+1 --> 0
c    ( b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧  b^{45, 1}_0 ∧  p_45) -> (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧ -b^{45, 2}_0)
c  in CNF:
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_2
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_1
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_0
c  in DIMACS:
-16478  16479 -16480 -45 -16481 0
-16478  16479 -16480 -45 -16482 0
-16478  16479 -16480 -45 -16483 0

c  0+1 --> 1
c    (-b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧  p_45) -> (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0)
c  in CNF:
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_2
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_1
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨  b^{45, 2}_0
c  in DIMACS:
 16478  16479  16480 -45 -16481 0
 16478  16479  16480 -45 -16482 0
 16478  16479  16480 -45  16483 0

c  1+1 --> 2
c    (-b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧  b^{45, 1}_0 ∧  p_45) -> (-b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0)
c  in CNF:
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_2
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨  b^{45, 2}_1
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ -p_45 ∨ -b^{45, 2}_0
c  in DIMACS:
 16478  16479 -16480 -45 -16481 0
 16478  16479 -16480 -45  16482 0
 16478  16479 -16480 -45 -16483 0

c  2+1 --> break 
c    (-b^{45, 1}_2 ∧  b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧  p_45) -> break
c  in CNF:
c     b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ -p_45 ∨ break
c  in DIMACS:
 16478 -16479  16480 -45 1162 0


c  2-1 --> 1
c    (-b^{45, 1}_2 ∧  b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧ -p_45) -> (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0)
c  in CNF:
c     b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_2
c     b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_1
c     b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨  b^{45, 2}_0
c  in DIMACS:
 16478 -16479  16480  45 -16481 0
 16478 -16479  16480  45 -16482 0
 16478 -16479  16480  45  16483 0

c  1-1 --> 0
c    (-b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧  b^{45, 1}_0 ∧ -p_45) -> (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧ -b^{45, 2}_0)
c  in CNF:
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_2
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_1
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_0
c  in DIMACS:
 16478  16479 -16480  45 -16481 0
 16478  16479 -16480  45 -16482 0
 16478  16479 -16480  45 -16483 0

c  0-1 --> -1
c    (-b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧ -p_45) -> ( b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0)
c  in CNF:
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨  b^{45, 2}_2
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_1
c     b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨  b^{45, 2}_0
c  in DIMACS:
 16478  16479  16480  45  16481 0
 16478  16479  16480  45 -16482 0
 16478  16479  16480  45  16483 0

c  -1-1 --> -2
c    ( b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧  b^{45, 1}_0 ∧ -p_45) -> ( b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0)
c  in CNF:
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨  b^{45, 2}_2
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨  b^{45, 2}_1
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨  p_45 ∨ -b^{45, 2}_0
c  in DIMACS:
-16478  16479 -16480  45  16481 0
-16478  16479 -16480  45  16482 0
-16478  16479 -16480  45 -16483 0

c  -2-1 --> break 
c    ( b^{45, 1}_2 ∧  b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧ -p_45) -> break
c  in CNF:
c    -b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨  b^{45, 1}_0 ∨  p_45 ∨ break
c  in DIMACS:
-16478 -16479  16480  45 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 1}_2 ∧ -b^{45, 1}_1 ∧ -b^{45, 1}_0 ∧ true) 
c  in CNF:
c    -b^{45, 1}_2 ∨  b^{45, 1}_1 ∨  b^{45, 1}_0 ∨ false 
c  in DIMACS:
-16478  16479  16480  0

c  3 does not represent an automaton state.
c    -(-b^{45, 1}_2 ∧  b^{45, 1}_1 ∧  b^{45, 1}_0 ∧ true) 
c  in CNF:
c     b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ false 
c  in DIMACS:
 16478 -16479 -16480  0
c  -3 does not represent an automaton state.
c    -( b^{45, 1}_2 ∧  b^{45, 1}_1 ∧  b^{45, 1}_0 ∧ true) 
c  in CNF:
c    -b^{45, 1}_2 ∨ -b^{45, 1}_1 ∨ -b^{45, 1}_0 ∨ false 
c  in DIMACS:
-16478 -16479 -16480  0

c i = 2
c  -2+1 --> -1
c    ( b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧  p_90) -> ( b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0)
c  in CNF:
c    -b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨  b^{45, 3}_2
c    -b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_1
c    -b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨  b^{45, 3}_0
c  in DIMACS:
-16481 -16482  16483 -90  16484 0
-16481 -16482  16483 -90 -16485 0
-16481 -16482  16483 -90  16486 0

c  -1+1 --> 0
c    ( b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0 ∧  p_90) -> (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧ -b^{45, 3}_0)
c  in CNF:
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_2
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_1
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_0
c  in DIMACS:
-16481  16482 -16483 -90 -16484 0
-16481  16482 -16483 -90 -16485 0
-16481  16482 -16483 -90 -16486 0

c  0+1 --> 1
c    (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧  p_90) -> (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0)
c  in CNF:
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_2
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_1
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨  b^{45, 3}_0
c  in DIMACS:
 16481  16482  16483 -90 -16484 0
 16481  16482  16483 -90 -16485 0
 16481  16482  16483 -90  16486 0

c  1+1 --> 2
c    (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0 ∧  p_90) -> (-b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0)
c  in CNF:
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_2
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨  b^{45, 3}_1
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ -p_90 ∨ -b^{45, 3}_0
c  in DIMACS:
 16481  16482 -16483 -90 -16484 0
 16481  16482 -16483 -90  16485 0
 16481  16482 -16483 -90 -16486 0

c  2+1 --> break 
c    (-b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧  p_90) -> break
c  in CNF:
c     b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 16481 -16482  16483 -90 1162 0


c  2-1 --> 1
c    (-b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧ -p_90) -> (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0)
c  in CNF:
c     b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_2
c     b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_1
c     b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨  b^{45, 3}_0
c  in DIMACS:
 16481 -16482  16483  90 -16484 0
 16481 -16482  16483  90 -16485 0
 16481 -16482  16483  90  16486 0

c  1-1 --> 0
c    (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0 ∧ -p_90) -> (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧ -b^{45, 3}_0)
c  in CNF:
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_2
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_1
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_0
c  in DIMACS:
 16481  16482 -16483  90 -16484 0
 16481  16482 -16483  90 -16485 0
 16481  16482 -16483  90 -16486 0

c  0-1 --> -1
c    (-b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧ -p_90) -> ( b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0)
c  in CNF:
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨  b^{45, 3}_2
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_1
c     b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨  b^{45, 3}_0
c  in DIMACS:
 16481  16482  16483  90  16484 0
 16481  16482  16483  90 -16485 0
 16481  16482  16483  90  16486 0

c  -1-1 --> -2
c    ( b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧  b^{45, 2}_0 ∧ -p_90) -> ( b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0)
c  in CNF:
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨  b^{45, 3}_2
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨  b^{45, 3}_1
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨  p_90 ∨ -b^{45, 3}_0
c  in DIMACS:
-16481  16482 -16483  90  16484 0
-16481  16482 -16483  90  16485 0
-16481  16482 -16483  90 -16486 0

c  -2-1 --> break 
c    ( b^{45, 2}_2 ∧  b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨  b^{45, 2}_0 ∨  p_90 ∨ break
c  in DIMACS:
-16481 -16482  16483  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 2}_2 ∧ -b^{45, 2}_1 ∧ -b^{45, 2}_0 ∧ true) 
c  in CNF:
c    -b^{45, 2}_2 ∨  b^{45, 2}_1 ∨  b^{45, 2}_0 ∨ false 
c  in DIMACS:
-16481  16482  16483  0

c  3 does not represent an automaton state.
c    -(-b^{45, 2}_2 ∧  b^{45, 2}_1 ∧  b^{45, 2}_0 ∧ true) 
c  in CNF:
c     b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ false 
c  in DIMACS:
 16481 -16482 -16483  0
c  -3 does not represent an automaton state.
c    -( b^{45, 2}_2 ∧  b^{45, 2}_1 ∧  b^{45, 2}_0 ∧ true) 
c  in CNF:
c    -b^{45, 2}_2 ∨ -b^{45, 2}_1 ∨ -b^{45, 2}_0 ∨ false 
c  in DIMACS:
-16481 -16482 -16483  0

c i = 3
c  -2+1 --> -1
c    ( b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧  p_135) -> ( b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0)
c  in CNF:
c    -b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨  b^{45, 4}_2
c    -b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_1
c    -b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨  b^{45, 4}_0
c  in DIMACS:
-16484 -16485  16486 -135  16487 0
-16484 -16485  16486 -135 -16488 0
-16484 -16485  16486 -135  16489 0

c  -1+1 --> 0
c    ( b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0 ∧  p_135) -> (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧ -b^{45, 4}_0)
c  in CNF:
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_2
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_1
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_0
c  in DIMACS:
-16484  16485 -16486 -135 -16487 0
-16484  16485 -16486 -135 -16488 0
-16484  16485 -16486 -135 -16489 0

c  0+1 --> 1
c    (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧  p_135) -> (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0)
c  in CNF:
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_2
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_1
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨  b^{45, 4}_0
c  in DIMACS:
 16484  16485  16486 -135 -16487 0
 16484  16485  16486 -135 -16488 0
 16484  16485  16486 -135  16489 0

c  1+1 --> 2
c    (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0 ∧  p_135) -> (-b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0)
c  in CNF:
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_2
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨  b^{45, 4}_1
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ -p_135 ∨ -b^{45, 4}_0
c  in DIMACS:
 16484  16485 -16486 -135 -16487 0
 16484  16485 -16486 -135  16488 0
 16484  16485 -16486 -135 -16489 0

c  2+1 --> break 
c    (-b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧  p_135) -> break
c  in CNF:
c     b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 16484 -16485  16486 -135 1162 0


c  2-1 --> 1
c    (-b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧ -p_135) -> (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0)
c  in CNF:
c     b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_2
c     b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_1
c     b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨  b^{45, 4}_0
c  in DIMACS:
 16484 -16485  16486  135 -16487 0
 16484 -16485  16486  135 -16488 0
 16484 -16485  16486  135  16489 0

c  1-1 --> 0
c    (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0 ∧ -p_135) -> (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧ -b^{45, 4}_0)
c  in CNF:
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_2
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_1
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_0
c  in DIMACS:
 16484  16485 -16486  135 -16487 0
 16484  16485 -16486  135 -16488 0
 16484  16485 -16486  135 -16489 0

c  0-1 --> -1
c    (-b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧ -p_135) -> ( b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0)
c  in CNF:
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨  b^{45, 4}_2
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_1
c     b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨  b^{45, 4}_0
c  in DIMACS:
 16484  16485  16486  135  16487 0
 16484  16485  16486  135 -16488 0
 16484  16485  16486  135  16489 0

c  -1-1 --> -2
c    ( b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧  b^{45, 3}_0 ∧ -p_135) -> ( b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0)
c  in CNF:
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨  b^{45, 4}_2
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨  b^{45, 4}_1
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨  p_135 ∨ -b^{45, 4}_0
c  in DIMACS:
-16484  16485 -16486  135  16487 0
-16484  16485 -16486  135  16488 0
-16484  16485 -16486  135 -16489 0

c  -2-1 --> break 
c    ( b^{45, 3}_2 ∧  b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨  b^{45, 3}_0 ∨  p_135 ∨ break
c  in DIMACS:
-16484 -16485  16486  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 3}_2 ∧ -b^{45, 3}_1 ∧ -b^{45, 3}_0 ∧ true) 
c  in CNF:
c    -b^{45, 3}_2 ∨  b^{45, 3}_1 ∨  b^{45, 3}_0 ∨ false 
c  in DIMACS:
-16484  16485  16486  0

c  3 does not represent an automaton state.
c    -(-b^{45, 3}_2 ∧  b^{45, 3}_1 ∧  b^{45, 3}_0 ∧ true) 
c  in CNF:
c     b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ false 
c  in DIMACS:
 16484 -16485 -16486  0
c  -3 does not represent an automaton state.
c    -( b^{45, 3}_2 ∧  b^{45, 3}_1 ∧  b^{45, 3}_0 ∧ true) 
c  in CNF:
c    -b^{45, 3}_2 ∨ -b^{45, 3}_1 ∨ -b^{45, 3}_0 ∨ false 
c  in DIMACS:
-16484 -16485 -16486  0

c i = 4
c  -2+1 --> -1
c    ( b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧  p_180) -> ( b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0)
c  in CNF:
c    -b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨  b^{45, 5}_2
c    -b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_1
c    -b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨  b^{45, 5}_0
c  in DIMACS:
-16487 -16488  16489 -180  16490 0
-16487 -16488  16489 -180 -16491 0
-16487 -16488  16489 -180  16492 0

c  -1+1 --> 0
c    ( b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0 ∧  p_180) -> (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧ -b^{45, 5}_0)
c  in CNF:
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_2
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_1
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_0
c  in DIMACS:
-16487  16488 -16489 -180 -16490 0
-16487  16488 -16489 -180 -16491 0
-16487  16488 -16489 -180 -16492 0

c  0+1 --> 1
c    (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧  p_180) -> (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0)
c  in CNF:
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_2
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_1
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨  b^{45, 5}_0
c  in DIMACS:
 16487  16488  16489 -180 -16490 0
 16487  16488  16489 -180 -16491 0
 16487  16488  16489 -180  16492 0

c  1+1 --> 2
c    (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0 ∧  p_180) -> (-b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0)
c  in CNF:
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_2
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨  b^{45, 5}_1
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ -p_180 ∨ -b^{45, 5}_0
c  in DIMACS:
 16487  16488 -16489 -180 -16490 0
 16487  16488 -16489 -180  16491 0
 16487  16488 -16489 -180 -16492 0

c  2+1 --> break 
c    (-b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧  p_180) -> break
c  in CNF:
c     b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 16487 -16488  16489 -180 1162 0


c  2-1 --> 1
c    (-b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧ -p_180) -> (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0)
c  in CNF:
c     b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_2
c     b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_1
c     b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨  b^{45, 5}_0
c  in DIMACS:
 16487 -16488  16489  180 -16490 0
 16487 -16488  16489  180 -16491 0
 16487 -16488  16489  180  16492 0

c  1-1 --> 0
c    (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0 ∧ -p_180) -> (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧ -b^{45, 5}_0)
c  in CNF:
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_2
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_1
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_0
c  in DIMACS:
 16487  16488 -16489  180 -16490 0
 16487  16488 -16489  180 -16491 0
 16487  16488 -16489  180 -16492 0

c  0-1 --> -1
c    (-b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧ -p_180) -> ( b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0)
c  in CNF:
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨  b^{45, 5}_2
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_1
c     b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨  b^{45, 5}_0
c  in DIMACS:
 16487  16488  16489  180  16490 0
 16487  16488  16489  180 -16491 0
 16487  16488  16489  180  16492 0

c  -1-1 --> -2
c    ( b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧  b^{45, 4}_0 ∧ -p_180) -> ( b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0)
c  in CNF:
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨  b^{45, 5}_2
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨  b^{45, 5}_1
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨  p_180 ∨ -b^{45, 5}_0
c  in DIMACS:
-16487  16488 -16489  180  16490 0
-16487  16488 -16489  180  16491 0
-16487  16488 -16489  180 -16492 0

c  -2-1 --> break 
c    ( b^{45, 4}_2 ∧  b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨  b^{45, 4}_0 ∨  p_180 ∨ break
c  in DIMACS:
-16487 -16488  16489  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 4}_2 ∧ -b^{45, 4}_1 ∧ -b^{45, 4}_0 ∧ true) 
c  in CNF:
c    -b^{45, 4}_2 ∨  b^{45, 4}_1 ∨  b^{45, 4}_0 ∨ false 
c  in DIMACS:
-16487  16488  16489  0

c  3 does not represent an automaton state.
c    -(-b^{45, 4}_2 ∧  b^{45, 4}_1 ∧  b^{45, 4}_0 ∧ true) 
c  in CNF:
c     b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ false 
c  in DIMACS:
 16487 -16488 -16489  0
c  -3 does not represent an automaton state.
c    -( b^{45, 4}_2 ∧  b^{45, 4}_1 ∧  b^{45, 4}_0 ∧ true) 
c  in CNF:
c    -b^{45, 4}_2 ∨ -b^{45, 4}_1 ∨ -b^{45, 4}_0 ∨ false 
c  in DIMACS:
-16487 -16488 -16489  0

c i = 5
c  -2+1 --> -1
c    ( b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧  p_225) -> ( b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0)
c  in CNF:
c    -b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨  b^{45, 6}_2
c    -b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_1
c    -b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨  b^{45, 6}_0
c  in DIMACS:
-16490 -16491  16492 -225  16493 0
-16490 -16491  16492 -225 -16494 0
-16490 -16491  16492 -225  16495 0

c  -1+1 --> 0
c    ( b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0 ∧  p_225) -> (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧ -b^{45, 6}_0)
c  in CNF:
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_2
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_1
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_0
c  in DIMACS:
-16490  16491 -16492 -225 -16493 0
-16490  16491 -16492 -225 -16494 0
-16490  16491 -16492 -225 -16495 0

c  0+1 --> 1
c    (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧  p_225) -> (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0)
c  in CNF:
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_2
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_1
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨  b^{45, 6}_0
c  in DIMACS:
 16490  16491  16492 -225 -16493 0
 16490  16491  16492 -225 -16494 0
 16490  16491  16492 -225  16495 0

c  1+1 --> 2
c    (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0 ∧  p_225) -> (-b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0)
c  in CNF:
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_2
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨  b^{45, 6}_1
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ -p_225 ∨ -b^{45, 6}_0
c  in DIMACS:
 16490  16491 -16492 -225 -16493 0
 16490  16491 -16492 -225  16494 0
 16490  16491 -16492 -225 -16495 0

c  2+1 --> break 
c    (-b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧  p_225) -> break
c  in CNF:
c     b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 16490 -16491  16492 -225 1162 0


c  2-1 --> 1
c    (-b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧ -p_225) -> (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0)
c  in CNF:
c     b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_2
c     b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_1
c     b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨  b^{45, 6}_0
c  in DIMACS:
 16490 -16491  16492  225 -16493 0
 16490 -16491  16492  225 -16494 0
 16490 -16491  16492  225  16495 0

c  1-1 --> 0
c    (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0 ∧ -p_225) -> (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧ -b^{45, 6}_0)
c  in CNF:
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_2
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_1
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_0
c  in DIMACS:
 16490  16491 -16492  225 -16493 0
 16490  16491 -16492  225 -16494 0
 16490  16491 -16492  225 -16495 0

c  0-1 --> -1
c    (-b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧ -p_225) -> ( b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0)
c  in CNF:
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨  b^{45, 6}_2
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_1
c     b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨  b^{45, 6}_0
c  in DIMACS:
 16490  16491  16492  225  16493 0
 16490  16491  16492  225 -16494 0
 16490  16491  16492  225  16495 0

c  -1-1 --> -2
c    ( b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧  b^{45, 5}_0 ∧ -p_225) -> ( b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0)
c  in CNF:
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨  b^{45, 6}_2
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨  b^{45, 6}_1
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨  p_225 ∨ -b^{45, 6}_0
c  in DIMACS:
-16490  16491 -16492  225  16493 0
-16490  16491 -16492  225  16494 0
-16490  16491 -16492  225 -16495 0

c  -2-1 --> break 
c    ( b^{45, 5}_2 ∧  b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨  b^{45, 5}_0 ∨  p_225 ∨ break
c  in DIMACS:
-16490 -16491  16492  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 5}_2 ∧ -b^{45, 5}_1 ∧ -b^{45, 5}_0 ∧ true) 
c  in CNF:
c    -b^{45, 5}_2 ∨  b^{45, 5}_1 ∨  b^{45, 5}_0 ∨ false 
c  in DIMACS:
-16490  16491  16492  0

c  3 does not represent an automaton state.
c    -(-b^{45, 5}_2 ∧  b^{45, 5}_1 ∧  b^{45, 5}_0 ∧ true) 
c  in CNF:
c     b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ false 
c  in DIMACS:
 16490 -16491 -16492  0
c  -3 does not represent an automaton state.
c    -( b^{45, 5}_2 ∧  b^{45, 5}_1 ∧  b^{45, 5}_0 ∧ true) 
c  in CNF:
c    -b^{45, 5}_2 ∨ -b^{45, 5}_1 ∨ -b^{45, 5}_0 ∨ false 
c  in DIMACS:
-16490 -16491 -16492  0

c i = 6
c  -2+1 --> -1
c    ( b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧  p_270) -> ( b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0)
c  in CNF:
c    -b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨  b^{45, 7}_2
c    -b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_1
c    -b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨  b^{45, 7}_0
c  in DIMACS:
-16493 -16494  16495 -270  16496 0
-16493 -16494  16495 -270 -16497 0
-16493 -16494  16495 -270  16498 0

c  -1+1 --> 0
c    ( b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0 ∧  p_270) -> (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧ -b^{45, 7}_0)
c  in CNF:
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_2
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_1
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_0
c  in DIMACS:
-16493  16494 -16495 -270 -16496 0
-16493  16494 -16495 -270 -16497 0
-16493  16494 -16495 -270 -16498 0

c  0+1 --> 1
c    (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧  p_270) -> (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0)
c  in CNF:
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_2
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_1
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨  b^{45, 7}_0
c  in DIMACS:
 16493  16494  16495 -270 -16496 0
 16493  16494  16495 -270 -16497 0
 16493  16494  16495 -270  16498 0

c  1+1 --> 2
c    (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0 ∧  p_270) -> (-b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0)
c  in CNF:
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_2
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨  b^{45, 7}_1
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ -p_270 ∨ -b^{45, 7}_0
c  in DIMACS:
 16493  16494 -16495 -270 -16496 0
 16493  16494 -16495 -270  16497 0
 16493  16494 -16495 -270 -16498 0

c  2+1 --> break 
c    (-b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧  p_270) -> break
c  in CNF:
c     b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 16493 -16494  16495 -270 1162 0


c  2-1 --> 1
c    (-b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧ -p_270) -> (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0)
c  in CNF:
c     b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_2
c     b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_1
c     b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨  b^{45, 7}_0
c  in DIMACS:
 16493 -16494  16495  270 -16496 0
 16493 -16494  16495  270 -16497 0
 16493 -16494  16495  270  16498 0

c  1-1 --> 0
c    (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0 ∧ -p_270) -> (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧ -b^{45, 7}_0)
c  in CNF:
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_2
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_1
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_0
c  in DIMACS:
 16493  16494 -16495  270 -16496 0
 16493  16494 -16495  270 -16497 0
 16493  16494 -16495  270 -16498 0

c  0-1 --> -1
c    (-b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧ -p_270) -> ( b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0)
c  in CNF:
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨  b^{45, 7}_2
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_1
c     b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨  b^{45, 7}_0
c  in DIMACS:
 16493  16494  16495  270  16496 0
 16493  16494  16495  270 -16497 0
 16493  16494  16495  270  16498 0

c  -1-1 --> -2
c    ( b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧  b^{45, 6}_0 ∧ -p_270) -> ( b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0)
c  in CNF:
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨  b^{45, 7}_2
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨  b^{45, 7}_1
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨  p_270 ∨ -b^{45, 7}_0
c  in DIMACS:
-16493  16494 -16495  270  16496 0
-16493  16494 -16495  270  16497 0
-16493  16494 -16495  270 -16498 0

c  -2-1 --> break 
c    ( b^{45, 6}_2 ∧  b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨  b^{45, 6}_0 ∨  p_270 ∨ break
c  in DIMACS:
-16493 -16494  16495  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 6}_2 ∧ -b^{45, 6}_1 ∧ -b^{45, 6}_0 ∧ true) 
c  in CNF:
c    -b^{45, 6}_2 ∨  b^{45, 6}_1 ∨  b^{45, 6}_0 ∨ false 
c  in DIMACS:
-16493  16494  16495  0

c  3 does not represent an automaton state.
c    -(-b^{45, 6}_2 ∧  b^{45, 6}_1 ∧  b^{45, 6}_0 ∧ true) 
c  in CNF:
c     b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ false 
c  in DIMACS:
 16493 -16494 -16495  0
c  -3 does not represent an automaton state.
c    -( b^{45, 6}_2 ∧  b^{45, 6}_1 ∧  b^{45, 6}_0 ∧ true) 
c  in CNF:
c    -b^{45, 6}_2 ∨ -b^{45, 6}_1 ∨ -b^{45, 6}_0 ∨ false 
c  in DIMACS:
-16493 -16494 -16495  0

c i = 7
c  -2+1 --> -1
c    ( b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧  p_315) -> ( b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0)
c  in CNF:
c    -b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨  b^{45, 8}_2
c    -b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_1
c    -b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨  b^{45, 8}_0
c  in DIMACS:
-16496 -16497  16498 -315  16499 0
-16496 -16497  16498 -315 -16500 0
-16496 -16497  16498 -315  16501 0

c  -1+1 --> 0
c    ( b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0 ∧  p_315) -> (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧ -b^{45, 8}_0)
c  in CNF:
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_2
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_1
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_0
c  in DIMACS:
-16496  16497 -16498 -315 -16499 0
-16496  16497 -16498 -315 -16500 0
-16496  16497 -16498 -315 -16501 0

c  0+1 --> 1
c    (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧  p_315) -> (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0)
c  in CNF:
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_2
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_1
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨  b^{45, 8}_0
c  in DIMACS:
 16496  16497  16498 -315 -16499 0
 16496  16497  16498 -315 -16500 0
 16496  16497  16498 -315  16501 0

c  1+1 --> 2
c    (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0 ∧  p_315) -> (-b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0)
c  in CNF:
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_2
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨  b^{45, 8}_1
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ -p_315 ∨ -b^{45, 8}_0
c  in DIMACS:
 16496  16497 -16498 -315 -16499 0
 16496  16497 -16498 -315  16500 0
 16496  16497 -16498 -315 -16501 0

c  2+1 --> break 
c    (-b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧  p_315) -> break
c  in CNF:
c     b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 16496 -16497  16498 -315 1162 0


c  2-1 --> 1
c    (-b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧ -p_315) -> (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0)
c  in CNF:
c     b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_2
c     b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_1
c     b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨  b^{45, 8}_0
c  in DIMACS:
 16496 -16497  16498  315 -16499 0
 16496 -16497  16498  315 -16500 0
 16496 -16497  16498  315  16501 0

c  1-1 --> 0
c    (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0 ∧ -p_315) -> (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧ -b^{45, 8}_0)
c  in CNF:
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_2
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_1
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_0
c  in DIMACS:
 16496  16497 -16498  315 -16499 0
 16496  16497 -16498  315 -16500 0
 16496  16497 -16498  315 -16501 0

c  0-1 --> -1
c    (-b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧ -p_315) -> ( b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0)
c  in CNF:
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨  b^{45, 8}_2
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_1
c     b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨  b^{45, 8}_0
c  in DIMACS:
 16496  16497  16498  315  16499 0
 16496  16497  16498  315 -16500 0
 16496  16497  16498  315  16501 0

c  -1-1 --> -2
c    ( b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧  b^{45, 7}_0 ∧ -p_315) -> ( b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0)
c  in CNF:
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨  b^{45, 8}_2
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨  b^{45, 8}_1
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨  p_315 ∨ -b^{45, 8}_0
c  in DIMACS:
-16496  16497 -16498  315  16499 0
-16496  16497 -16498  315  16500 0
-16496  16497 -16498  315 -16501 0

c  -2-1 --> break 
c    ( b^{45, 7}_2 ∧  b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨  b^{45, 7}_0 ∨  p_315 ∨ break
c  in DIMACS:
-16496 -16497  16498  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 7}_2 ∧ -b^{45, 7}_1 ∧ -b^{45, 7}_0 ∧ true) 
c  in CNF:
c    -b^{45, 7}_2 ∨  b^{45, 7}_1 ∨  b^{45, 7}_0 ∨ false 
c  in DIMACS:
-16496  16497  16498  0

c  3 does not represent an automaton state.
c    -(-b^{45, 7}_2 ∧  b^{45, 7}_1 ∧  b^{45, 7}_0 ∧ true) 
c  in CNF:
c     b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ false 
c  in DIMACS:
 16496 -16497 -16498  0
c  -3 does not represent an automaton state.
c    -( b^{45, 7}_2 ∧  b^{45, 7}_1 ∧  b^{45, 7}_0 ∧ true) 
c  in CNF:
c    -b^{45, 7}_2 ∨ -b^{45, 7}_1 ∨ -b^{45, 7}_0 ∨ false 
c  in DIMACS:
-16496 -16497 -16498  0

c i = 8
c  -2+1 --> -1
c    ( b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧  p_360) -> ( b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0)
c  in CNF:
c    -b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨  b^{45, 9}_2
c    -b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_1
c    -b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨  b^{45, 9}_0
c  in DIMACS:
-16499 -16500  16501 -360  16502 0
-16499 -16500  16501 -360 -16503 0
-16499 -16500  16501 -360  16504 0

c  -1+1 --> 0
c    ( b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0 ∧  p_360) -> (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧ -b^{45, 9}_0)
c  in CNF:
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_2
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_1
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_0
c  in DIMACS:
-16499  16500 -16501 -360 -16502 0
-16499  16500 -16501 -360 -16503 0
-16499  16500 -16501 -360 -16504 0

c  0+1 --> 1
c    (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧  p_360) -> (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0)
c  in CNF:
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_2
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_1
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨  b^{45, 9}_0
c  in DIMACS:
 16499  16500  16501 -360 -16502 0
 16499  16500  16501 -360 -16503 0
 16499  16500  16501 -360  16504 0

c  1+1 --> 2
c    (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0 ∧  p_360) -> (-b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0)
c  in CNF:
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_2
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨  b^{45, 9}_1
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ -p_360 ∨ -b^{45, 9}_0
c  in DIMACS:
 16499  16500 -16501 -360 -16502 0
 16499  16500 -16501 -360  16503 0
 16499  16500 -16501 -360 -16504 0

c  2+1 --> break 
c    (-b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧  p_360) -> break
c  in CNF:
c     b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 16499 -16500  16501 -360 1162 0


c  2-1 --> 1
c    (-b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧ -p_360) -> (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0)
c  in CNF:
c     b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_2
c     b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_1
c     b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨  b^{45, 9}_0
c  in DIMACS:
 16499 -16500  16501  360 -16502 0
 16499 -16500  16501  360 -16503 0
 16499 -16500  16501  360  16504 0

c  1-1 --> 0
c    (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0 ∧ -p_360) -> (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧ -b^{45, 9}_0)
c  in CNF:
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_2
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_1
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_0
c  in DIMACS:
 16499  16500 -16501  360 -16502 0
 16499  16500 -16501  360 -16503 0
 16499  16500 -16501  360 -16504 0

c  0-1 --> -1
c    (-b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧ -p_360) -> ( b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0)
c  in CNF:
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨  b^{45, 9}_2
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_1
c     b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨  b^{45, 9}_0
c  in DIMACS:
 16499  16500  16501  360  16502 0
 16499  16500  16501  360 -16503 0
 16499  16500  16501  360  16504 0

c  -1-1 --> -2
c    ( b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧  b^{45, 8}_0 ∧ -p_360) -> ( b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0)
c  in CNF:
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨  b^{45, 9}_2
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨  b^{45, 9}_1
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨  p_360 ∨ -b^{45, 9}_0
c  in DIMACS:
-16499  16500 -16501  360  16502 0
-16499  16500 -16501  360  16503 0
-16499  16500 -16501  360 -16504 0

c  -2-1 --> break 
c    ( b^{45, 8}_2 ∧  b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨  b^{45, 8}_0 ∨  p_360 ∨ break
c  in DIMACS:
-16499 -16500  16501  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 8}_2 ∧ -b^{45, 8}_1 ∧ -b^{45, 8}_0 ∧ true) 
c  in CNF:
c    -b^{45, 8}_2 ∨  b^{45, 8}_1 ∨  b^{45, 8}_0 ∨ false 
c  in DIMACS:
-16499  16500  16501  0

c  3 does not represent an automaton state.
c    -(-b^{45, 8}_2 ∧  b^{45, 8}_1 ∧  b^{45, 8}_0 ∧ true) 
c  in CNF:
c     b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ false 
c  in DIMACS:
 16499 -16500 -16501  0
c  -3 does not represent an automaton state.
c    -( b^{45, 8}_2 ∧  b^{45, 8}_1 ∧  b^{45, 8}_0 ∧ true) 
c  in CNF:
c    -b^{45, 8}_2 ∨ -b^{45, 8}_1 ∨ -b^{45, 8}_0 ∨ false 
c  in DIMACS:
-16499 -16500 -16501  0

c i = 9
c  -2+1 --> -1
c    ( b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧  p_405) -> ( b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0)
c  in CNF:
c    -b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨  b^{45, 10}_2
c    -b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_1
c    -b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨  b^{45, 10}_0
c  in DIMACS:
-16502 -16503  16504 -405  16505 0
-16502 -16503  16504 -405 -16506 0
-16502 -16503  16504 -405  16507 0

c  -1+1 --> 0
c    ( b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0 ∧  p_405) -> (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧ -b^{45, 10}_0)
c  in CNF:
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_2
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_1
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_0
c  in DIMACS:
-16502  16503 -16504 -405 -16505 0
-16502  16503 -16504 -405 -16506 0
-16502  16503 -16504 -405 -16507 0

c  0+1 --> 1
c    (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧  p_405) -> (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0)
c  in CNF:
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_2
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_1
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨  b^{45, 10}_0
c  in DIMACS:
 16502  16503  16504 -405 -16505 0
 16502  16503  16504 -405 -16506 0
 16502  16503  16504 -405  16507 0

c  1+1 --> 2
c    (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0 ∧  p_405) -> (-b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0)
c  in CNF:
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_2
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨  b^{45, 10}_1
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ -p_405 ∨ -b^{45, 10}_0
c  in DIMACS:
 16502  16503 -16504 -405 -16505 0
 16502  16503 -16504 -405  16506 0
 16502  16503 -16504 -405 -16507 0

c  2+1 --> break 
c    (-b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧  p_405) -> break
c  in CNF:
c     b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 16502 -16503  16504 -405 1162 0


c  2-1 --> 1
c    (-b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧ -p_405) -> (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0)
c  in CNF:
c     b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_2
c     b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_1
c     b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨  b^{45, 10}_0
c  in DIMACS:
 16502 -16503  16504  405 -16505 0
 16502 -16503  16504  405 -16506 0
 16502 -16503  16504  405  16507 0

c  1-1 --> 0
c    (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0 ∧ -p_405) -> (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧ -b^{45, 10}_0)
c  in CNF:
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_2
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_1
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_0
c  in DIMACS:
 16502  16503 -16504  405 -16505 0
 16502  16503 -16504  405 -16506 0
 16502  16503 -16504  405 -16507 0

c  0-1 --> -1
c    (-b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧ -p_405) -> ( b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0)
c  in CNF:
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨  b^{45, 10}_2
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_1
c     b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨  b^{45, 10}_0
c  in DIMACS:
 16502  16503  16504  405  16505 0
 16502  16503  16504  405 -16506 0
 16502  16503  16504  405  16507 0

c  -1-1 --> -2
c    ( b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧  b^{45, 9}_0 ∧ -p_405) -> ( b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0)
c  in CNF:
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨  b^{45, 10}_2
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨  b^{45, 10}_1
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨  p_405 ∨ -b^{45, 10}_0
c  in DIMACS:
-16502  16503 -16504  405  16505 0
-16502  16503 -16504  405  16506 0
-16502  16503 -16504  405 -16507 0

c  -2-1 --> break 
c    ( b^{45, 9}_2 ∧  b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨  b^{45, 9}_0 ∨  p_405 ∨ break
c  in DIMACS:
-16502 -16503  16504  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 9}_2 ∧ -b^{45, 9}_1 ∧ -b^{45, 9}_0 ∧ true) 
c  in CNF:
c    -b^{45, 9}_2 ∨  b^{45, 9}_1 ∨  b^{45, 9}_0 ∨ false 
c  in DIMACS:
-16502  16503  16504  0

c  3 does not represent an automaton state.
c    -(-b^{45, 9}_2 ∧  b^{45, 9}_1 ∧  b^{45, 9}_0 ∧ true) 
c  in CNF:
c     b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ false 
c  in DIMACS:
 16502 -16503 -16504  0
c  -3 does not represent an automaton state.
c    -( b^{45, 9}_2 ∧  b^{45, 9}_1 ∧  b^{45, 9}_0 ∧ true) 
c  in CNF:
c    -b^{45, 9}_2 ∨ -b^{45, 9}_1 ∨ -b^{45, 9}_0 ∨ false 
c  in DIMACS:
-16502 -16503 -16504  0

c i = 10
c  -2+1 --> -1
c    ( b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧  p_450) -> ( b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0)
c  in CNF:
c    -b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨  b^{45, 11}_2
c    -b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_1
c    -b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨  b^{45, 11}_0
c  in DIMACS:
-16505 -16506  16507 -450  16508 0
-16505 -16506  16507 -450 -16509 0
-16505 -16506  16507 -450  16510 0

c  -1+1 --> 0
c    ( b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0 ∧  p_450) -> (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧ -b^{45, 11}_0)
c  in CNF:
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_2
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_1
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_0
c  in DIMACS:
-16505  16506 -16507 -450 -16508 0
-16505  16506 -16507 -450 -16509 0
-16505  16506 -16507 -450 -16510 0

c  0+1 --> 1
c    (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧  p_450) -> (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0)
c  in CNF:
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_2
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_1
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨  b^{45, 11}_0
c  in DIMACS:
 16505  16506  16507 -450 -16508 0
 16505  16506  16507 -450 -16509 0
 16505  16506  16507 -450  16510 0

c  1+1 --> 2
c    (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0 ∧  p_450) -> (-b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0)
c  in CNF:
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_2
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨  b^{45, 11}_1
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ -p_450 ∨ -b^{45, 11}_0
c  in DIMACS:
 16505  16506 -16507 -450 -16508 0
 16505  16506 -16507 -450  16509 0
 16505  16506 -16507 -450 -16510 0

c  2+1 --> break 
c    (-b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧  p_450) -> break
c  in CNF:
c     b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 16505 -16506  16507 -450 1162 0


c  2-1 --> 1
c    (-b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧ -p_450) -> (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0)
c  in CNF:
c     b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_2
c     b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_1
c     b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨  b^{45, 11}_0
c  in DIMACS:
 16505 -16506  16507  450 -16508 0
 16505 -16506  16507  450 -16509 0
 16505 -16506  16507  450  16510 0

c  1-1 --> 0
c    (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0 ∧ -p_450) -> (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧ -b^{45, 11}_0)
c  in CNF:
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_2
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_1
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_0
c  in DIMACS:
 16505  16506 -16507  450 -16508 0
 16505  16506 -16507  450 -16509 0
 16505  16506 -16507  450 -16510 0

c  0-1 --> -1
c    (-b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧ -p_450) -> ( b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0)
c  in CNF:
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨  b^{45, 11}_2
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_1
c     b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨  b^{45, 11}_0
c  in DIMACS:
 16505  16506  16507  450  16508 0
 16505  16506  16507  450 -16509 0
 16505  16506  16507  450  16510 0

c  -1-1 --> -2
c    ( b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧  b^{45, 10}_0 ∧ -p_450) -> ( b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0)
c  in CNF:
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨  b^{45, 11}_2
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨  b^{45, 11}_1
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨  p_450 ∨ -b^{45, 11}_0
c  in DIMACS:
-16505  16506 -16507  450  16508 0
-16505  16506 -16507  450  16509 0
-16505  16506 -16507  450 -16510 0

c  -2-1 --> break 
c    ( b^{45, 10}_2 ∧  b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨  b^{45, 10}_0 ∨  p_450 ∨ break
c  in DIMACS:
-16505 -16506  16507  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 10}_2 ∧ -b^{45, 10}_1 ∧ -b^{45, 10}_0 ∧ true) 
c  in CNF:
c    -b^{45, 10}_2 ∨  b^{45, 10}_1 ∨  b^{45, 10}_0 ∨ false 
c  in DIMACS:
-16505  16506  16507  0

c  3 does not represent an automaton state.
c    -(-b^{45, 10}_2 ∧  b^{45, 10}_1 ∧  b^{45, 10}_0 ∧ true) 
c  in CNF:
c     b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ false 
c  in DIMACS:
 16505 -16506 -16507  0
c  -3 does not represent an automaton state.
c    -( b^{45, 10}_2 ∧  b^{45, 10}_1 ∧  b^{45, 10}_0 ∧ true) 
c  in CNF:
c    -b^{45, 10}_2 ∨ -b^{45, 10}_1 ∨ -b^{45, 10}_0 ∨ false 
c  in DIMACS:
-16505 -16506 -16507  0

c i = 11
c  -2+1 --> -1
c    ( b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧  p_495) -> ( b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0)
c  in CNF:
c    -b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨  b^{45, 12}_2
c    -b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_1
c    -b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨  b^{45, 12}_0
c  in DIMACS:
-16508 -16509  16510 -495  16511 0
-16508 -16509  16510 -495 -16512 0
-16508 -16509  16510 -495  16513 0

c  -1+1 --> 0
c    ( b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0 ∧  p_495) -> (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧ -b^{45, 12}_0)
c  in CNF:
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_2
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_1
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_0
c  in DIMACS:
-16508  16509 -16510 -495 -16511 0
-16508  16509 -16510 -495 -16512 0
-16508  16509 -16510 -495 -16513 0

c  0+1 --> 1
c    (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧  p_495) -> (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0)
c  in CNF:
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_2
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_1
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨  b^{45, 12}_0
c  in DIMACS:
 16508  16509  16510 -495 -16511 0
 16508  16509  16510 -495 -16512 0
 16508  16509  16510 -495  16513 0

c  1+1 --> 2
c    (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0 ∧  p_495) -> (-b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0)
c  in CNF:
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_2
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨  b^{45, 12}_1
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ -p_495 ∨ -b^{45, 12}_0
c  in DIMACS:
 16508  16509 -16510 -495 -16511 0
 16508  16509 -16510 -495  16512 0
 16508  16509 -16510 -495 -16513 0

c  2+1 --> break 
c    (-b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧  p_495) -> break
c  in CNF:
c     b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 16508 -16509  16510 -495 1162 0


c  2-1 --> 1
c    (-b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧ -p_495) -> (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0)
c  in CNF:
c     b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_2
c     b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_1
c     b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨  b^{45, 12}_0
c  in DIMACS:
 16508 -16509  16510  495 -16511 0
 16508 -16509  16510  495 -16512 0
 16508 -16509  16510  495  16513 0

c  1-1 --> 0
c    (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0 ∧ -p_495) -> (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧ -b^{45, 12}_0)
c  in CNF:
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_2
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_1
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_0
c  in DIMACS:
 16508  16509 -16510  495 -16511 0
 16508  16509 -16510  495 -16512 0
 16508  16509 -16510  495 -16513 0

c  0-1 --> -1
c    (-b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧ -p_495) -> ( b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0)
c  in CNF:
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨  b^{45, 12}_2
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_1
c     b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨  b^{45, 12}_0
c  in DIMACS:
 16508  16509  16510  495  16511 0
 16508  16509  16510  495 -16512 0
 16508  16509  16510  495  16513 0

c  -1-1 --> -2
c    ( b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧  b^{45, 11}_0 ∧ -p_495) -> ( b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0)
c  in CNF:
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨  b^{45, 12}_2
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨  b^{45, 12}_1
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨  p_495 ∨ -b^{45, 12}_0
c  in DIMACS:
-16508  16509 -16510  495  16511 0
-16508  16509 -16510  495  16512 0
-16508  16509 -16510  495 -16513 0

c  -2-1 --> break 
c    ( b^{45, 11}_2 ∧  b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨  b^{45, 11}_0 ∨  p_495 ∨ break
c  in DIMACS:
-16508 -16509  16510  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 11}_2 ∧ -b^{45, 11}_1 ∧ -b^{45, 11}_0 ∧ true) 
c  in CNF:
c    -b^{45, 11}_2 ∨  b^{45, 11}_1 ∨  b^{45, 11}_0 ∨ false 
c  in DIMACS:
-16508  16509  16510  0

c  3 does not represent an automaton state.
c    -(-b^{45, 11}_2 ∧  b^{45, 11}_1 ∧  b^{45, 11}_0 ∧ true) 
c  in CNF:
c     b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ false 
c  in DIMACS:
 16508 -16509 -16510  0
c  -3 does not represent an automaton state.
c    -( b^{45, 11}_2 ∧  b^{45, 11}_1 ∧  b^{45, 11}_0 ∧ true) 
c  in CNF:
c    -b^{45, 11}_2 ∨ -b^{45, 11}_1 ∨ -b^{45, 11}_0 ∨ false 
c  in DIMACS:
-16508 -16509 -16510  0

c i = 12
c  -2+1 --> -1
c    ( b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧  p_540) -> ( b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0)
c  in CNF:
c    -b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨  b^{45, 13}_2
c    -b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_1
c    -b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨  b^{45, 13}_0
c  in DIMACS:
-16511 -16512  16513 -540  16514 0
-16511 -16512  16513 -540 -16515 0
-16511 -16512  16513 -540  16516 0

c  -1+1 --> 0
c    ( b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0 ∧  p_540) -> (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧ -b^{45, 13}_0)
c  in CNF:
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_2
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_1
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_0
c  in DIMACS:
-16511  16512 -16513 -540 -16514 0
-16511  16512 -16513 -540 -16515 0
-16511  16512 -16513 -540 -16516 0

c  0+1 --> 1
c    (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧  p_540) -> (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0)
c  in CNF:
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_2
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_1
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨  b^{45, 13}_0
c  in DIMACS:
 16511  16512  16513 -540 -16514 0
 16511  16512  16513 -540 -16515 0
 16511  16512  16513 -540  16516 0

c  1+1 --> 2
c    (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0 ∧  p_540) -> (-b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0)
c  in CNF:
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_2
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨  b^{45, 13}_1
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ -p_540 ∨ -b^{45, 13}_0
c  in DIMACS:
 16511  16512 -16513 -540 -16514 0
 16511  16512 -16513 -540  16515 0
 16511  16512 -16513 -540 -16516 0

c  2+1 --> break 
c    (-b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧  p_540) -> break
c  in CNF:
c     b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 16511 -16512  16513 -540 1162 0


c  2-1 --> 1
c    (-b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧ -p_540) -> (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0)
c  in CNF:
c     b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_2
c     b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_1
c     b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨  b^{45, 13}_0
c  in DIMACS:
 16511 -16512  16513  540 -16514 0
 16511 -16512  16513  540 -16515 0
 16511 -16512  16513  540  16516 0

c  1-1 --> 0
c    (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0 ∧ -p_540) -> (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧ -b^{45, 13}_0)
c  in CNF:
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_2
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_1
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_0
c  in DIMACS:
 16511  16512 -16513  540 -16514 0
 16511  16512 -16513  540 -16515 0
 16511  16512 -16513  540 -16516 0

c  0-1 --> -1
c    (-b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧ -p_540) -> ( b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0)
c  in CNF:
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨  b^{45, 13}_2
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_1
c     b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨  b^{45, 13}_0
c  in DIMACS:
 16511  16512  16513  540  16514 0
 16511  16512  16513  540 -16515 0
 16511  16512  16513  540  16516 0

c  -1-1 --> -2
c    ( b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧  b^{45, 12}_0 ∧ -p_540) -> ( b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0)
c  in CNF:
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨  b^{45, 13}_2
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨  b^{45, 13}_1
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨  p_540 ∨ -b^{45, 13}_0
c  in DIMACS:
-16511  16512 -16513  540  16514 0
-16511  16512 -16513  540  16515 0
-16511  16512 -16513  540 -16516 0

c  -2-1 --> break 
c    ( b^{45, 12}_2 ∧  b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨  b^{45, 12}_0 ∨  p_540 ∨ break
c  in DIMACS:
-16511 -16512  16513  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 12}_2 ∧ -b^{45, 12}_1 ∧ -b^{45, 12}_0 ∧ true) 
c  in CNF:
c    -b^{45, 12}_2 ∨  b^{45, 12}_1 ∨  b^{45, 12}_0 ∨ false 
c  in DIMACS:
-16511  16512  16513  0

c  3 does not represent an automaton state.
c    -(-b^{45, 12}_2 ∧  b^{45, 12}_1 ∧  b^{45, 12}_0 ∧ true) 
c  in CNF:
c     b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ false 
c  in DIMACS:
 16511 -16512 -16513  0
c  -3 does not represent an automaton state.
c    -( b^{45, 12}_2 ∧  b^{45, 12}_1 ∧  b^{45, 12}_0 ∧ true) 
c  in CNF:
c    -b^{45, 12}_2 ∨ -b^{45, 12}_1 ∨ -b^{45, 12}_0 ∨ false 
c  in DIMACS:
-16511 -16512 -16513  0

c i = 13
c  -2+1 --> -1
c    ( b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧  p_585) -> ( b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0)
c  in CNF:
c    -b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨  b^{45, 14}_2
c    -b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_1
c    -b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨  b^{45, 14}_0
c  in DIMACS:
-16514 -16515  16516 -585  16517 0
-16514 -16515  16516 -585 -16518 0
-16514 -16515  16516 -585  16519 0

c  -1+1 --> 0
c    ( b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0 ∧  p_585) -> (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧ -b^{45, 14}_0)
c  in CNF:
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_2
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_1
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_0
c  in DIMACS:
-16514  16515 -16516 -585 -16517 0
-16514  16515 -16516 -585 -16518 0
-16514  16515 -16516 -585 -16519 0

c  0+1 --> 1
c    (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧  p_585) -> (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0)
c  in CNF:
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_2
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_1
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨  b^{45, 14}_0
c  in DIMACS:
 16514  16515  16516 -585 -16517 0
 16514  16515  16516 -585 -16518 0
 16514  16515  16516 -585  16519 0

c  1+1 --> 2
c    (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0 ∧  p_585) -> (-b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0)
c  in CNF:
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_2
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨  b^{45, 14}_1
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ -p_585 ∨ -b^{45, 14}_0
c  in DIMACS:
 16514  16515 -16516 -585 -16517 0
 16514  16515 -16516 -585  16518 0
 16514  16515 -16516 -585 -16519 0

c  2+1 --> break 
c    (-b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧  p_585) -> break
c  in CNF:
c     b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 16514 -16515  16516 -585 1162 0


c  2-1 --> 1
c    (-b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧ -p_585) -> (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0)
c  in CNF:
c     b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_2
c     b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_1
c     b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨  b^{45, 14}_0
c  in DIMACS:
 16514 -16515  16516  585 -16517 0
 16514 -16515  16516  585 -16518 0
 16514 -16515  16516  585  16519 0

c  1-1 --> 0
c    (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0 ∧ -p_585) -> (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧ -b^{45, 14}_0)
c  in CNF:
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_2
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_1
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_0
c  in DIMACS:
 16514  16515 -16516  585 -16517 0
 16514  16515 -16516  585 -16518 0
 16514  16515 -16516  585 -16519 0

c  0-1 --> -1
c    (-b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧ -p_585) -> ( b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0)
c  in CNF:
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨  b^{45, 14}_2
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_1
c     b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨  b^{45, 14}_0
c  in DIMACS:
 16514  16515  16516  585  16517 0
 16514  16515  16516  585 -16518 0
 16514  16515  16516  585  16519 0

c  -1-1 --> -2
c    ( b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧  b^{45, 13}_0 ∧ -p_585) -> ( b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0)
c  in CNF:
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨  b^{45, 14}_2
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨  b^{45, 14}_1
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨  p_585 ∨ -b^{45, 14}_0
c  in DIMACS:
-16514  16515 -16516  585  16517 0
-16514  16515 -16516  585  16518 0
-16514  16515 -16516  585 -16519 0

c  -2-1 --> break 
c    ( b^{45, 13}_2 ∧  b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨  b^{45, 13}_0 ∨  p_585 ∨ break
c  in DIMACS:
-16514 -16515  16516  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 13}_2 ∧ -b^{45, 13}_1 ∧ -b^{45, 13}_0 ∧ true) 
c  in CNF:
c    -b^{45, 13}_2 ∨  b^{45, 13}_1 ∨  b^{45, 13}_0 ∨ false 
c  in DIMACS:
-16514  16515  16516  0

c  3 does not represent an automaton state.
c    -(-b^{45, 13}_2 ∧  b^{45, 13}_1 ∧  b^{45, 13}_0 ∧ true) 
c  in CNF:
c     b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ false 
c  in DIMACS:
 16514 -16515 -16516  0
c  -3 does not represent an automaton state.
c    -( b^{45, 13}_2 ∧  b^{45, 13}_1 ∧  b^{45, 13}_0 ∧ true) 
c  in CNF:
c    -b^{45, 13}_2 ∨ -b^{45, 13}_1 ∨ -b^{45, 13}_0 ∨ false 
c  in DIMACS:
-16514 -16515 -16516  0

c i = 14
c  -2+1 --> -1
c    ( b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧  p_630) -> ( b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0)
c  in CNF:
c    -b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨  b^{45, 15}_2
c    -b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_1
c    -b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨  b^{45, 15}_0
c  in DIMACS:
-16517 -16518  16519 -630  16520 0
-16517 -16518  16519 -630 -16521 0
-16517 -16518  16519 -630  16522 0

c  -1+1 --> 0
c    ( b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0 ∧  p_630) -> (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧ -b^{45, 15}_0)
c  in CNF:
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_2
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_1
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_0
c  in DIMACS:
-16517  16518 -16519 -630 -16520 0
-16517  16518 -16519 -630 -16521 0
-16517  16518 -16519 -630 -16522 0

c  0+1 --> 1
c    (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧  p_630) -> (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0)
c  in CNF:
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_2
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_1
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨  b^{45, 15}_0
c  in DIMACS:
 16517  16518  16519 -630 -16520 0
 16517  16518  16519 -630 -16521 0
 16517  16518  16519 -630  16522 0

c  1+1 --> 2
c    (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0 ∧  p_630) -> (-b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0)
c  in CNF:
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_2
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨  b^{45, 15}_1
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ -p_630 ∨ -b^{45, 15}_0
c  in DIMACS:
 16517  16518 -16519 -630 -16520 0
 16517  16518 -16519 -630  16521 0
 16517  16518 -16519 -630 -16522 0

c  2+1 --> break 
c    (-b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧  p_630) -> break
c  in CNF:
c     b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 16517 -16518  16519 -630 1162 0


c  2-1 --> 1
c    (-b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧ -p_630) -> (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0)
c  in CNF:
c     b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_2
c     b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_1
c     b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨  b^{45, 15}_0
c  in DIMACS:
 16517 -16518  16519  630 -16520 0
 16517 -16518  16519  630 -16521 0
 16517 -16518  16519  630  16522 0

c  1-1 --> 0
c    (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0 ∧ -p_630) -> (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧ -b^{45, 15}_0)
c  in CNF:
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_2
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_1
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_0
c  in DIMACS:
 16517  16518 -16519  630 -16520 0
 16517  16518 -16519  630 -16521 0
 16517  16518 -16519  630 -16522 0

c  0-1 --> -1
c    (-b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧ -p_630) -> ( b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0)
c  in CNF:
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨  b^{45, 15}_2
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_1
c     b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨  b^{45, 15}_0
c  in DIMACS:
 16517  16518  16519  630  16520 0
 16517  16518  16519  630 -16521 0
 16517  16518  16519  630  16522 0

c  -1-1 --> -2
c    ( b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧  b^{45, 14}_0 ∧ -p_630) -> ( b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0)
c  in CNF:
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨  b^{45, 15}_2
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨  b^{45, 15}_1
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨  p_630 ∨ -b^{45, 15}_0
c  in DIMACS:
-16517  16518 -16519  630  16520 0
-16517  16518 -16519  630  16521 0
-16517  16518 -16519  630 -16522 0

c  -2-1 --> break 
c    ( b^{45, 14}_2 ∧  b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨  b^{45, 14}_0 ∨  p_630 ∨ break
c  in DIMACS:
-16517 -16518  16519  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 14}_2 ∧ -b^{45, 14}_1 ∧ -b^{45, 14}_0 ∧ true) 
c  in CNF:
c    -b^{45, 14}_2 ∨  b^{45, 14}_1 ∨  b^{45, 14}_0 ∨ false 
c  in DIMACS:
-16517  16518  16519  0

c  3 does not represent an automaton state.
c    -(-b^{45, 14}_2 ∧  b^{45, 14}_1 ∧  b^{45, 14}_0 ∧ true) 
c  in CNF:
c     b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ false 
c  in DIMACS:
 16517 -16518 -16519  0
c  -3 does not represent an automaton state.
c    -( b^{45, 14}_2 ∧  b^{45, 14}_1 ∧  b^{45, 14}_0 ∧ true) 
c  in CNF:
c    -b^{45, 14}_2 ∨ -b^{45, 14}_1 ∨ -b^{45, 14}_0 ∨ false 
c  in DIMACS:
-16517 -16518 -16519  0

c i = 15
c  -2+1 --> -1
c    ( b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧  p_675) -> ( b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0)
c  in CNF:
c    -b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨  b^{45, 16}_2
c    -b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_1
c    -b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨  b^{45, 16}_0
c  in DIMACS:
-16520 -16521  16522 -675  16523 0
-16520 -16521  16522 -675 -16524 0
-16520 -16521  16522 -675  16525 0

c  -1+1 --> 0
c    ( b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0 ∧  p_675) -> (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧ -b^{45, 16}_0)
c  in CNF:
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_2
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_1
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_0
c  in DIMACS:
-16520  16521 -16522 -675 -16523 0
-16520  16521 -16522 -675 -16524 0
-16520  16521 -16522 -675 -16525 0

c  0+1 --> 1
c    (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧  p_675) -> (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0)
c  in CNF:
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_2
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_1
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨  b^{45, 16}_0
c  in DIMACS:
 16520  16521  16522 -675 -16523 0
 16520  16521  16522 -675 -16524 0
 16520  16521  16522 -675  16525 0

c  1+1 --> 2
c    (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0 ∧  p_675) -> (-b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0)
c  in CNF:
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_2
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨  b^{45, 16}_1
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ -p_675 ∨ -b^{45, 16}_0
c  in DIMACS:
 16520  16521 -16522 -675 -16523 0
 16520  16521 -16522 -675  16524 0
 16520  16521 -16522 -675 -16525 0

c  2+1 --> break 
c    (-b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧  p_675) -> break
c  in CNF:
c     b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 16520 -16521  16522 -675 1162 0


c  2-1 --> 1
c    (-b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧ -p_675) -> (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0)
c  in CNF:
c     b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_2
c     b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_1
c     b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨  b^{45, 16}_0
c  in DIMACS:
 16520 -16521  16522  675 -16523 0
 16520 -16521  16522  675 -16524 0
 16520 -16521  16522  675  16525 0

c  1-1 --> 0
c    (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0 ∧ -p_675) -> (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧ -b^{45, 16}_0)
c  in CNF:
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_2
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_1
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_0
c  in DIMACS:
 16520  16521 -16522  675 -16523 0
 16520  16521 -16522  675 -16524 0
 16520  16521 -16522  675 -16525 0

c  0-1 --> -1
c    (-b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧ -p_675) -> ( b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0)
c  in CNF:
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨  b^{45, 16}_2
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_1
c     b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨  b^{45, 16}_0
c  in DIMACS:
 16520  16521  16522  675  16523 0
 16520  16521  16522  675 -16524 0
 16520  16521  16522  675  16525 0

c  -1-1 --> -2
c    ( b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧  b^{45, 15}_0 ∧ -p_675) -> ( b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0)
c  in CNF:
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨  b^{45, 16}_2
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨  b^{45, 16}_1
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨  p_675 ∨ -b^{45, 16}_0
c  in DIMACS:
-16520  16521 -16522  675  16523 0
-16520  16521 -16522  675  16524 0
-16520  16521 -16522  675 -16525 0

c  -2-1 --> break 
c    ( b^{45, 15}_2 ∧  b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨  b^{45, 15}_0 ∨  p_675 ∨ break
c  in DIMACS:
-16520 -16521  16522  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 15}_2 ∧ -b^{45, 15}_1 ∧ -b^{45, 15}_0 ∧ true) 
c  in CNF:
c    -b^{45, 15}_2 ∨  b^{45, 15}_1 ∨  b^{45, 15}_0 ∨ false 
c  in DIMACS:
-16520  16521  16522  0

c  3 does not represent an automaton state.
c    -(-b^{45, 15}_2 ∧  b^{45, 15}_1 ∧  b^{45, 15}_0 ∧ true) 
c  in CNF:
c     b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ false 
c  in DIMACS:
 16520 -16521 -16522  0
c  -3 does not represent an automaton state.
c    -( b^{45, 15}_2 ∧  b^{45, 15}_1 ∧  b^{45, 15}_0 ∧ true) 
c  in CNF:
c    -b^{45, 15}_2 ∨ -b^{45, 15}_1 ∨ -b^{45, 15}_0 ∨ false 
c  in DIMACS:
-16520 -16521 -16522  0

c i = 16
c  -2+1 --> -1
c    ( b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧  p_720) -> ( b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0)
c  in CNF:
c    -b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨  b^{45, 17}_2
c    -b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_1
c    -b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨  b^{45, 17}_0
c  in DIMACS:
-16523 -16524  16525 -720  16526 0
-16523 -16524  16525 -720 -16527 0
-16523 -16524  16525 -720  16528 0

c  -1+1 --> 0
c    ( b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0 ∧  p_720) -> (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧ -b^{45, 17}_0)
c  in CNF:
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_2
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_1
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_0
c  in DIMACS:
-16523  16524 -16525 -720 -16526 0
-16523  16524 -16525 -720 -16527 0
-16523  16524 -16525 -720 -16528 0

c  0+1 --> 1
c    (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧  p_720) -> (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0)
c  in CNF:
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_2
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_1
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨  b^{45, 17}_0
c  in DIMACS:
 16523  16524  16525 -720 -16526 0
 16523  16524  16525 -720 -16527 0
 16523  16524  16525 -720  16528 0

c  1+1 --> 2
c    (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0 ∧  p_720) -> (-b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0)
c  in CNF:
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_2
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨  b^{45, 17}_1
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ -p_720 ∨ -b^{45, 17}_0
c  in DIMACS:
 16523  16524 -16525 -720 -16526 0
 16523  16524 -16525 -720  16527 0
 16523  16524 -16525 -720 -16528 0

c  2+1 --> break 
c    (-b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧  p_720) -> break
c  in CNF:
c     b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 16523 -16524  16525 -720 1162 0


c  2-1 --> 1
c    (-b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧ -p_720) -> (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0)
c  in CNF:
c     b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_2
c     b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_1
c     b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨  b^{45, 17}_0
c  in DIMACS:
 16523 -16524  16525  720 -16526 0
 16523 -16524  16525  720 -16527 0
 16523 -16524  16525  720  16528 0

c  1-1 --> 0
c    (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0 ∧ -p_720) -> (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧ -b^{45, 17}_0)
c  in CNF:
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_2
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_1
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_0
c  in DIMACS:
 16523  16524 -16525  720 -16526 0
 16523  16524 -16525  720 -16527 0
 16523  16524 -16525  720 -16528 0

c  0-1 --> -1
c    (-b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧ -p_720) -> ( b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0)
c  in CNF:
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨  b^{45, 17}_2
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_1
c     b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨  b^{45, 17}_0
c  in DIMACS:
 16523  16524  16525  720  16526 0
 16523  16524  16525  720 -16527 0
 16523  16524  16525  720  16528 0

c  -1-1 --> -2
c    ( b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧  b^{45, 16}_0 ∧ -p_720) -> ( b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0)
c  in CNF:
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨  b^{45, 17}_2
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨  b^{45, 17}_1
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨  p_720 ∨ -b^{45, 17}_0
c  in DIMACS:
-16523  16524 -16525  720  16526 0
-16523  16524 -16525  720  16527 0
-16523  16524 -16525  720 -16528 0

c  -2-1 --> break 
c    ( b^{45, 16}_2 ∧  b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨  b^{45, 16}_0 ∨  p_720 ∨ break
c  in DIMACS:
-16523 -16524  16525  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 16}_2 ∧ -b^{45, 16}_1 ∧ -b^{45, 16}_0 ∧ true) 
c  in CNF:
c    -b^{45, 16}_2 ∨  b^{45, 16}_1 ∨  b^{45, 16}_0 ∨ false 
c  in DIMACS:
-16523  16524  16525  0

c  3 does not represent an automaton state.
c    -(-b^{45, 16}_2 ∧  b^{45, 16}_1 ∧  b^{45, 16}_0 ∧ true) 
c  in CNF:
c     b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ false 
c  in DIMACS:
 16523 -16524 -16525  0
c  -3 does not represent an automaton state.
c    -( b^{45, 16}_2 ∧  b^{45, 16}_1 ∧  b^{45, 16}_0 ∧ true) 
c  in CNF:
c    -b^{45, 16}_2 ∨ -b^{45, 16}_1 ∨ -b^{45, 16}_0 ∨ false 
c  in DIMACS:
-16523 -16524 -16525  0

c i = 17
c  -2+1 --> -1
c    ( b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧  p_765) -> ( b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0)
c  in CNF:
c    -b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨  b^{45, 18}_2
c    -b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_1
c    -b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨  b^{45, 18}_0
c  in DIMACS:
-16526 -16527  16528 -765  16529 0
-16526 -16527  16528 -765 -16530 0
-16526 -16527  16528 -765  16531 0

c  -1+1 --> 0
c    ( b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0 ∧  p_765) -> (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧ -b^{45, 18}_0)
c  in CNF:
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_2
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_1
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_0
c  in DIMACS:
-16526  16527 -16528 -765 -16529 0
-16526  16527 -16528 -765 -16530 0
-16526  16527 -16528 -765 -16531 0

c  0+1 --> 1
c    (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧  p_765) -> (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0)
c  in CNF:
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_2
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_1
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨  b^{45, 18}_0
c  in DIMACS:
 16526  16527  16528 -765 -16529 0
 16526  16527  16528 -765 -16530 0
 16526  16527  16528 -765  16531 0

c  1+1 --> 2
c    (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0 ∧  p_765) -> (-b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0)
c  in CNF:
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_2
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨  b^{45, 18}_1
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ -p_765 ∨ -b^{45, 18}_0
c  in DIMACS:
 16526  16527 -16528 -765 -16529 0
 16526  16527 -16528 -765  16530 0
 16526  16527 -16528 -765 -16531 0

c  2+1 --> break 
c    (-b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧  p_765) -> break
c  in CNF:
c     b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 16526 -16527  16528 -765 1162 0


c  2-1 --> 1
c    (-b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧ -p_765) -> (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0)
c  in CNF:
c     b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_2
c     b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_1
c     b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨  b^{45, 18}_0
c  in DIMACS:
 16526 -16527  16528  765 -16529 0
 16526 -16527  16528  765 -16530 0
 16526 -16527  16528  765  16531 0

c  1-1 --> 0
c    (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0 ∧ -p_765) -> (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧ -b^{45, 18}_0)
c  in CNF:
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_2
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_1
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_0
c  in DIMACS:
 16526  16527 -16528  765 -16529 0
 16526  16527 -16528  765 -16530 0
 16526  16527 -16528  765 -16531 0

c  0-1 --> -1
c    (-b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧ -p_765) -> ( b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0)
c  in CNF:
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨  b^{45, 18}_2
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_1
c     b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨  b^{45, 18}_0
c  in DIMACS:
 16526  16527  16528  765  16529 0
 16526  16527  16528  765 -16530 0
 16526  16527  16528  765  16531 0

c  -1-1 --> -2
c    ( b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧  b^{45, 17}_0 ∧ -p_765) -> ( b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0)
c  in CNF:
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨  b^{45, 18}_2
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨  b^{45, 18}_1
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨  p_765 ∨ -b^{45, 18}_0
c  in DIMACS:
-16526  16527 -16528  765  16529 0
-16526  16527 -16528  765  16530 0
-16526  16527 -16528  765 -16531 0

c  -2-1 --> break 
c    ( b^{45, 17}_2 ∧  b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨  b^{45, 17}_0 ∨  p_765 ∨ break
c  in DIMACS:
-16526 -16527  16528  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 17}_2 ∧ -b^{45, 17}_1 ∧ -b^{45, 17}_0 ∧ true) 
c  in CNF:
c    -b^{45, 17}_2 ∨  b^{45, 17}_1 ∨  b^{45, 17}_0 ∨ false 
c  in DIMACS:
-16526  16527  16528  0

c  3 does not represent an automaton state.
c    -(-b^{45, 17}_2 ∧  b^{45, 17}_1 ∧  b^{45, 17}_0 ∧ true) 
c  in CNF:
c     b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ false 
c  in DIMACS:
 16526 -16527 -16528  0
c  -3 does not represent an automaton state.
c    -( b^{45, 17}_2 ∧  b^{45, 17}_1 ∧  b^{45, 17}_0 ∧ true) 
c  in CNF:
c    -b^{45, 17}_2 ∨ -b^{45, 17}_1 ∨ -b^{45, 17}_0 ∨ false 
c  in DIMACS:
-16526 -16527 -16528  0

c i = 18
c  -2+1 --> -1
c    ( b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧  p_810) -> ( b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0)
c  in CNF:
c    -b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨  b^{45, 19}_2
c    -b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_1
c    -b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨  b^{45, 19}_0
c  in DIMACS:
-16529 -16530  16531 -810  16532 0
-16529 -16530  16531 -810 -16533 0
-16529 -16530  16531 -810  16534 0

c  -1+1 --> 0
c    ( b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0 ∧  p_810) -> (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧ -b^{45, 19}_0)
c  in CNF:
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_2
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_1
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_0
c  in DIMACS:
-16529  16530 -16531 -810 -16532 0
-16529  16530 -16531 -810 -16533 0
-16529  16530 -16531 -810 -16534 0

c  0+1 --> 1
c    (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧  p_810) -> (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0)
c  in CNF:
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_2
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_1
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨  b^{45, 19}_0
c  in DIMACS:
 16529  16530  16531 -810 -16532 0
 16529  16530  16531 -810 -16533 0
 16529  16530  16531 -810  16534 0

c  1+1 --> 2
c    (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0 ∧  p_810) -> (-b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0)
c  in CNF:
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_2
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨  b^{45, 19}_1
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ -p_810 ∨ -b^{45, 19}_0
c  in DIMACS:
 16529  16530 -16531 -810 -16532 0
 16529  16530 -16531 -810  16533 0
 16529  16530 -16531 -810 -16534 0

c  2+1 --> break 
c    (-b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧  p_810) -> break
c  in CNF:
c     b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 16529 -16530  16531 -810 1162 0


c  2-1 --> 1
c    (-b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧ -p_810) -> (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0)
c  in CNF:
c     b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_2
c     b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_1
c     b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨  b^{45, 19}_0
c  in DIMACS:
 16529 -16530  16531  810 -16532 0
 16529 -16530  16531  810 -16533 0
 16529 -16530  16531  810  16534 0

c  1-1 --> 0
c    (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0 ∧ -p_810) -> (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧ -b^{45, 19}_0)
c  in CNF:
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_2
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_1
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_0
c  in DIMACS:
 16529  16530 -16531  810 -16532 0
 16529  16530 -16531  810 -16533 0
 16529  16530 -16531  810 -16534 0

c  0-1 --> -1
c    (-b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧ -p_810) -> ( b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0)
c  in CNF:
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨  b^{45, 19}_2
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_1
c     b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨  b^{45, 19}_0
c  in DIMACS:
 16529  16530  16531  810  16532 0
 16529  16530  16531  810 -16533 0
 16529  16530  16531  810  16534 0

c  -1-1 --> -2
c    ( b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧  b^{45, 18}_0 ∧ -p_810) -> ( b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0)
c  in CNF:
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨  b^{45, 19}_2
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨  b^{45, 19}_1
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨  p_810 ∨ -b^{45, 19}_0
c  in DIMACS:
-16529  16530 -16531  810  16532 0
-16529  16530 -16531  810  16533 0
-16529  16530 -16531  810 -16534 0

c  -2-1 --> break 
c    ( b^{45, 18}_2 ∧  b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨  b^{45, 18}_0 ∨  p_810 ∨ break
c  in DIMACS:
-16529 -16530  16531  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 18}_2 ∧ -b^{45, 18}_1 ∧ -b^{45, 18}_0 ∧ true) 
c  in CNF:
c    -b^{45, 18}_2 ∨  b^{45, 18}_1 ∨  b^{45, 18}_0 ∨ false 
c  in DIMACS:
-16529  16530  16531  0

c  3 does not represent an automaton state.
c    -(-b^{45, 18}_2 ∧  b^{45, 18}_1 ∧  b^{45, 18}_0 ∧ true) 
c  in CNF:
c     b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ false 
c  in DIMACS:
 16529 -16530 -16531  0
c  -3 does not represent an automaton state.
c    -( b^{45, 18}_2 ∧  b^{45, 18}_1 ∧  b^{45, 18}_0 ∧ true) 
c  in CNF:
c    -b^{45, 18}_2 ∨ -b^{45, 18}_1 ∨ -b^{45, 18}_0 ∨ false 
c  in DIMACS:
-16529 -16530 -16531  0

c i = 19
c  -2+1 --> -1
c    ( b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧  p_855) -> ( b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0)
c  in CNF:
c    -b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨  b^{45, 20}_2
c    -b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_1
c    -b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨  b^{45, 20}_0
c  in DIMACS:
-16532 -16533  16534 -855  16535 0
-16532 -16533  16534 -855 -16536 0
-16532 -16533  16534 -855  16537 0

c  -1+1 --> 0
c    ( b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0 ∧  p_855) -> (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧ -b^{45, 20}_0)
c  in CNF:
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_2
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_1
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_0
c  in DIMACS:
-16532  16533 -16534 -855 -16535 0
-16532  16533 -16534 -855 -16536 0
-16532  16533 -16534 -855 -16537 0

c  0+1 --> 1
c    (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧  p_855) -> (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0)
c  in CNF:
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_2
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_1
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨  b^{45, 20}_0
c  in DIMACS:
 16532  16533  16534 -855 -16535 0
 16532  16533  16534 -855 -16536 0
 16532  16533  16534 -855  16537 0

c  1+1 --> 2
c    (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0 ∧  p_855) -> (-b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0)
c  in CNF:
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_2
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨  b^{45, 20}_1
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ -p_855 ∨ -b^{45, 20}_0
c  in DIMACS:
 16532  16533 -16534 -855 -16535 0
 16532  16533 -16534 -855  16536 0
 16532  16533 -16534 -855 -16537 0

c  2+1 --> break 
c    (-b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧  p_855) -> break
c  in CNF:
c     b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 16532 -16533  16534 -855 1162 0


c  2-1 --> 1
c    (-b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧ -p_855) -> (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0)
c  in CNF:
c     b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_2
c     b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_1
c     b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨  b^{45, 20}_0
c  in DIMACS:
 16532 -16533  16534  855 -16535 0
 16532 -16533  16534  855 -16536 0
 16532 -16533  16534  855  16537 0

c  1-1 --> 0
c    (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0 ∧ -p_855) -> (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧ -b^{45, 20}_0)
c  in CNF:
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_2
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_1
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_0
c  in DIMACS:
 16532  16533 -16534  855 -16535 0
 16532  16533 -16534  855 -16536 0
 16532  16533 -16534  855 -16537 0

c  0-1 --> -1
c    (-b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧ -p_855) -> ( b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0)
c  in CNF:
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨  b^{45, 20}_2
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_1
c     b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨  b^{45, 20}_0
c  in DIMACS:
 16532  16533  16534  855  16535 0
 16532  16533  16534  855 -16536 0
 16532  16533  16534  855  16537 0

c  -1-1 --> -2
c    ( b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧  b^{45, 19}_0 ∧ -p_855) -> ( b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0)
c  in CNF:
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨  b^{45, 20}_2
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨  b^{45, 20}_1
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨  p_855 ∨ -b^{45, 20}_0
c  in DIMACS:
-16532  16533 -16534  855  16535 0
-16532  16533 -16534  855  16536 0
-16532  16533 -16534  855 -16537 0

c  -2-1 --> break 
c    ( b^{45, 19}_2 ∧  b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨  b^{45, 19}_0 ∨  p_855 ∨ break
c  in DIMACS:
-16532 -16533  16534  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 19}_2 ∧ -b^{45, 19}_1 ∧ -b^{45, 19}_0 ∧ true) 
c  in CNF:
c    -b^{45, 19}_2 ∨  b^{45, 19}_1 ∨  b^{45, 19}_0 ∨ false 
c  in DIMACS:
-16532  16533  16534  0

c  3 does not represent an automaton state.
c    -(-b^{45, 19}_2 ∧  b^{45, 19}_1 ∧  b^{45, 19}_0 ∧ true) 
c  in CNF:
c     b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ false 
c  in DIMACS:
 16532 -16533 -16534  0
c  -3 does not represent an automaton state.
c    -( b^{45, 19}_2 ∧  b^{45, 19}_1 ∧  b^{45, 19}_0 ∧ true) 
c  in CNF:
c    -b^{45, 19}_2 ∨ -b^{45, 19}_1 ∨ -b^{45, 19}_0 ∨ false 
c  in DIMACS:
-16532 -16533 -16534  0

c i = 20
c  -2+1 --> -1
c    ( b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧  p_900) -> ( b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0)
c  in CNF:
c    -b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨  b^{45, 21}_2
c    -b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_1
c    -b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨  b^{45, 21}_0
c  in DIMACS:
-16535 -16536  16537 -900  16538 0
-16535 -16536  16537 -900 -16539 0
-16535 -16536  16537 -900  16540 0

c  -1+1 --> 0
c    ( b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0 ∧  p_900) -> (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧ -b^{45, 21}_0)
c  in CNF:
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_2
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_1
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_0
c  in DIMACS:
-16535  16536 -16537 -900 -16538 0
-16535  16536 -16537 -900 -16539 0
-16535  16536 -16537 -900 -16540 0

c  0+1 --> 1
c    (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧  p_900) -> (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0)
c  in CNF:
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_2
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_1
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨  b^{45, 21}_0
c  in DIMACS:
 16535  16536  16537 -900 -16538 0
 16535  16536  16537 -900 -16539 0
 16535  16536  16537 -900  16540 0

c  1+1 --> 2
c    (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0 ∧  p_900) -> (-b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0)
c  in CNF:
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_2
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨  b^{45, 21}_1
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ -p_900 ∨ -b^{45, 21}_0
c  in DIMACS:
 16535  16536 -16537 -900 -16538 0
 16535  16536 -16537 -900  16539 0
 16535  16536 -16537 -900 -16540 0

c  2+1 --> break 
c    (-b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧  p_900) -> break
c  in CNF:
c     b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 16535 -16536  16537 -900 1162 0


c  2-1 --> 1
c    (-b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧ -p_900) -> (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0)
c  in CNF:
c     b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_2
c     b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_1
c     b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨  b^{45, 21}_0
c  in DIMACS:
 16535 -16536  16537  900 -16538 0
 16535 -16536  16537  900 -16539 0
 16535 -16536  16537  900  16540 0

c  1-1 --> 0
c    (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0 ∧ -p_900) -> (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧ -b^{45, 21}_0)
c  in CNF:
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_2
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_1
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_0
c  in DIMACS:
 16535  16536 -16537  900 -16538 0
 16535  16536 -16537  900 -16539 0
 16535  16536 -16537  900 -16540 0

c  0-1 --> -1
c    (-b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧ -p_900) -> ( b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0)
c  in CNF:
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨  b^{45, 21}_2
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_1
c     b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨  b^{45, 21}_0
c  in DIMACS:
 16535  16536  16537  900  16538 0
 16535  16536  16537  900 -16539 0
 16535  16536  16537  900  16540 0

c  -1-1 --> -2
c    ( b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧  b^{45, 20}_0 ∧ -p_900) -> ( b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0)
c  in CNF:
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨  b^{45, 21}_2
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨  b^{45, 21}_1
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨  p_900 ∨ -b^{45, 21}_0
c  in DIMACS:
-16535  16536 -16537  900  16538 0
-16535  16536 -16537  900  16539 0
-16535  16536 -16537  900 -16540 0

c  -2-1 --> break 
c    ( b^{45, 20}_2 ∧  b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨  b^{45, 20}_0 ∨  p_900 ∨ break
c  in DIMACS:
-16535 -16536  16537  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 20}_2 ∧ -b^{45, 20}_1 ∧ -b^{45, 20}_0 ∧ true) 
c  in CNF:
c    -b^{45, 20}_2 ∨  b^{45, 20}_1 ∨  b^{45, 20}_0 ∨ false 
c  in DIMACS:
-16535  16536  16537  0

c  3 does not represent an automaton state.
c    -(-b^{45, 20}_2 ∧  b^{45, 20}_1 ∧  b^{45, 20}_0 ∧ true) 
c  in CNF:
c     b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ false 
c  in DIMACS:
 16535 -16536 -16537  0
c  -3 does not represent an automaton state.
c    -( b^{45, 20}_2 ∧  b^{45, 20}_1 ∧  b^{45, 20}_0 ∧ true) 
c  in CNF:
c    -b^{45, 20}_2 ∨ -b^{45, 20}_1 ∨ -b^{45, 20}_0 ∨ false 
c  in DIMACS:
-16535 -16536 -16537  0

c i = 21
c  -2+1 --> -1
c    ( b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧  p_945) -> ( b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0)
c  in CNF:
c    -b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨  b^{45, 22}_2
c    -b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_1
c    -b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨  b^{45, 22}_0
c  in DIMACS:
-16538 -16539  16540 -945  16541 0
-16538 -16539  16540 -945 -16542 0
-16538 -16539  16540 -945  16543 0

c  -1+1 --> 0
c    ( b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0 ∧  p_945) -> (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧ -b^{45, 22}_0)
c  in CNF:
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_2
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_1
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_0
c  in DIMACS:
-16538  16539 -16540 -945 -16541 0
-16538  16539 -16540 -945 -16542 0
-16538  16539 -16540 -945 -16543 0

c  0+1 --> 1
c    (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧  p_945) -> (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0)
c  in CNF:
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_2
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_1
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨  b^{45, 22}_0
c  in DIMACS:
 16538  16539  16540 -945 -16541 0
 16538  16539  16540 -945 -16542 0
 16538  16539  16540 -945  16543 0

c  1+1 --> 2
c    (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0 ∧  p_945) -> (-b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0)
c  in CNF:
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_2
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨  b^{45, 22}_1
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ -p_945 ∨ -b^{45, 22}_0
c  in DIMACS:
 16538  16539 -16540 -945 -16541 0
 16538  16539 -16540 -945  16542 0
 16538  16539 -16540 -945 -16543 0

c  2+1 --> break 
c    (-b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧  p_945) -> break
c  in CNF:
c     b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 16538 -16539  16540 -945 1162 0


c  2-1 --> 1
c    (-b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧ -p_945) -> (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0)
c  in CNF:
c     b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_2
c     b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_1
c     b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨  b^{45, 22}_0
c  in DIMACS:
 16538 -16539  16540  945 -16541 0
 16538 -16539  16540  945 -16542 0
 16538 -16539  16540  945  16543 0

c  1-1 --> 0
c    (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0 ∧ -p_945) -> (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧ -b^{45, 22}_0)
c  in CNF:
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_2
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_1
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_0
c  in DIMACS:
 16538  16539 -16540  945 -16541 0
 16538  16539 -16540  945 -16542 0
 16538  16539 -16540  945 -16543 0

c  0-1 --> -1
c    (-b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧ -p_945) -> ( b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0)
c  in CNF:
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨  b^{45, 22}_2
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_1
c     b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨  b^{45, 22}_0
c  in DIMACS:
 16538  16539  16540  945  16541 0
 16538  16539  16540  945 -16542 0
 16538  16539  16540  945  16543 0

c  -1-1 --> -2
c    ( b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧  b^{45, 21}_0 ∧ -p_945) -> ( b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0)
c  in CNF:
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨  b^{45, 22}_2
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨  b^{45, 22}_1
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨  p_945 ∨ -b^{45, 22}_0
c  in DIMACS:
-16538  16539 -16540  945  16541 0
-16538  16539 -16540  945  16542 0
-16538  16539 -16540  945 -16543 0

c  -2-1 --> break 
c    ( b^{45, 21}_2 ∧  b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨  b^{45, 21}_0 ∨  p_945 ∨ break
c  in DIMACS:
-16538 -16539  16540  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 21}_2 ∧ -b^{45, 21}_1 ∧ -b^{45, 21}_0 ∧ true) 
c  in CNF:
c    -b^{45, 21}_2 ∨  b^{45, 21}_1 ∨  b^{45, 21}_0 ∨ false 
c  in DIMACS:
-16538  16539  16540  0

c  3 does not represent an automaton state.
c    -(-b^{45, 21}_2 ∧  b^{45, 21}_1 ∧  b^{45, 21}_0 ∧ true) 
c  in CNF:
c     b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ false 
c  in DIMACS:
 16538 -16539 -16540  0
c  -3 does not represent an automaton state.
c    -( b^{45, 21}_2 ∧  b^{45, 21}_1 ∧  b^{45, 21}_0 ∧ true) 
c  in CNF:
c    -b^{45, 21}_2 ∨ -b^{45, 21}_1 ∨ -b^{45, 21}_0 ∨ false 
c  in DIMACS:
-16538 -16539 -16540  0

c i = 22
c  -2+1 --> -1
c    ( b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧  p_990) -> ( b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0)
c  in CNF:
c    -b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨  b^{45, 23}_2
c    -b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_1
c    -b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨  b^{45, 23}_0
c  in DIMACS:
-16541 -16542  16543 -990  16544 0
-16541 -16542  16543 -990 -16545 0
-16541 -16542  16543 -990  16546 0

c  -1+1 --> 0
c    ( b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0 ∧  p_990) -> (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧ -b^{45, 23}_0)
c  in CNF:
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_2
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_1
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_0
c  in DIMACS:
-16541  16542 -16543 -990 -16544 0
-16541  16542 -16543 -990 -16545 0
-16541  16542 -16543 -990 -16546 0

c  0+1 --> 1
c    (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧  p_990) -> (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0)
c  in CNF:
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_2
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_1
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨  b^{45, 23}_0
c  in DIMACS:
 16541  16542  16543 -990 -16544 0
 16541  16542  16543 -990 -16545 0
 16541  16542  16543 -990  16546 0

c  1+1 --> 2
c    (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0 ∧  p_990) -> (-b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0)
c  in CNF:
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_2
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨  b^{45, 23}_1
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ -p_990 ∨ -b^{45, 23}_0
c  in DIMACS:
 16541  16542 -16543 -990 -16544 0
 16541  16542 -16543 -990  16545 0
 16541  16542 -16543 -990 -16546 0

c  2+1 --> break 
c    (-b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧  p_990) -> break
c  in CNF:
c     b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 16541 -16542  16543 -990 1162 0


c  2-1 --> 1
c    (-b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧ -p_990) -> (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0)
c  in CNF:
c     b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_2
c     b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_1
c     b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨  b^{45, 23}_0
c  in DIMACS:
 16541 -16542  16543  990 -16544 0
 16541 -16542  16543  990 -16545 0
 16541 -16542  16543  990  16546 0

c  1-1 --> 0
c    (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0 ∧ -p_990) -> (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧ -b^{45, 23}_0)
c  in CNF:
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_2
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_1
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_0
c  in DIMACS:
 16541  16542 -16543  990 -16544 0
 16541  16542 -16543  990 -16545 0
 16541  16542 -16543  990 -16546 0

c  0-1 --> -1
c    (-b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧ -p_990) -> ( b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0)
c  in CNF:
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨  b^{45, 23}_2
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_1
c     b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨  b^{45, 23}_0
c  in DIMACS:
 16541  16542  16543  990  16544 0
 16541  16542  16543  990 -16545 0
 16541  16542  16543  990  16546 0

c  -1-1 --> -2
c    ( b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧  b^{45, 22}_0 ∧ -p_990) -> ( b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0)
c  in CNF:
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨  b^{45, 23}_2
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨  b^{45, 23}_1
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨  p_990 ∨ -b^{45, 23}_0
c  in DIMACS:
-16541  16542 -16543  990  16544 0
-16541  16542 -16543  990  16545 0
-16541  16542 -16543  990 -16546 0

c  -2-1 --> break 
c    ( b^{45, 22}_2 ∧  b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨  b^{45, 22}_0 ∨  p_990 ∨ break
c  in DIMACS:
-16541 -16542  16543  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 22}_2 ∧ -b^{45, 22}_1 ∧ -b^{45, 22}_0 ∧ true) 
c  in CNF:
c    -b^{45, 22}_2 ∨  b^{45, 22}_1 ∨  b^{45, 22}_0 ∨ false 
c  in DIMACS:
-16541  16542  16543  0

c  3 does not represent an automaton state.
c    -(-b^{45, 22}_2 ∧  b^{45, 22}_1 ∧  b^{45, 22}_0 ∧ true) 
c  in CNF:
c     b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ false 
c  in DIMACS:
 16541 -16542 -16543  0
c  -3 does not represent an automaton state.
c    -( b^{45, 22}_2 ∧  b^{45, 22}_1 ∧  b^{45, 22}_0 ∧ true) 
c  in CNF:
c    -b^{45, 22}_2 ∨ -b^{45, 22}_1 ∨ -b^{45, 22}_0 ∨ false 
c  in DIMACS:
-16541 -16542 -16543  0

c i = 23
c  -2+1 --> -1
c    ( b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧  p_1035) -> ( b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0)
c  in CNF:
c    -b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨  b^{45, 24}_2
c    -b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_1
c    -b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨  b^{45, 24}_0
c  in DIMACS:
-16544 -16545  16546 -1035  16547 0
-16544 -16545  16546 -1035 -16548 0
-16544 -16545  16546 -1035  16549 0

c  -1+1 --> 0
c    ( b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0 ∧  p_1035) -> (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧ -b^{45, 24}_0)
c  in CNF:
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_2
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_1
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_0
c  in DIMACS:
-16544  16545 -16546 -1035 -16547 0
-16544  16545 -16546 -1035 -16548 0
-16544  16545 -16546 -1035 -16549 0

c  0+1 --> 1
c    (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧  p_1035) -> (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0)
c  in CNF:
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_2
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_1
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨  b^{45, 24}_0
c  in DIMACS:
 16544  16545  16546 -1035 -16547 0
 16544  16545  16546 -1035 -16548 0
 16544  16545  16546 -1035  16549 0

c  1+1 --> 2
c    (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0 ∧  p_1035) -> (-b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0)
c  in CNF:
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_2
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨  b^{45, 24}_1
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ -p_1035 ∨ -b^{45, 24}_0
c  in DIMACS:
 16544  16545 -16546 -1035 -16547 0
 16544  16545 -16546 -1035  16548 0
 16544  16545 -16546 -1035 -16549 0

c  2+1 --> break 
c    (-b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 16544 -16545  16546 -1035 1162 0


c  2-1 --> 1
c    (-b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧ -p_1035) -> (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0)
c  in CNF:
c     b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_2
c     b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_1
c     b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨  b^{45, 24}_0
c  in DIMACS:
 16544 -16545  16546  1035 -16547 0
 16544 -16545  16546  1035 -16548 0
 16544 -16545  16546  1035  16549 0

c  1-1 --> 0
c    (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0 ∧ -p_1035) -> (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧ -b^{45, 24}_0)
c  in CNF:
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_2
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_1
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_0
c  in DIMACS:
 16544  16545 -16546  1035 -16547 0
 16544  16545 -16546  1035 -16548 0
 16544  16545 -16546  1035 -16549 0

c  0-1 --> -1
c    (-b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧ -p_1035) -> ( b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0)
c  in CNF:
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨  b^{45, 24}_2
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_1
c     b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨  b^{45, 24}_0
c  in DIMACS:
 16544  16545  16546  1035  16547 0
 16544  16545  16546  1035 -16548 0
 16544  16545  16546  1035  16549 0

c  -1-1 --> -2
c    ( b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧  b^{45, 23}_0 ∧ -p_1035) -> ( b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0)
c  in CNF:
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨  b^{45, 24}_2
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨  b^{45, 24}_1
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨  p_1035 ∨ -b^{45, 24}_0
c  in DIMACS:
-16544  16545 -16546  1035  16547 0
-16544  16545 -16546  1035  16548 0
-16544  16545 -16546  1035 -16549 0

c  -2-1 --> break 
c    ( b^{45, 23}_2 ∧  b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨  b^{45, 23}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-16544 -16545  16546  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 23}_2 ∧ -b^{45, 23}_1 ∧ -b^{45, 23}_0 ∧ true) 
c  in CNF:
c    -b^{45, 23}_2 ∨  b^{45, 23}_1 ∨  b^{45, 23}_0 ∨ false 
c  in DIMACS:
-16544  16545  16546  0

c  3 does not represent an automaton state.
c    -(-b^{45, 23}_2 ∧  b^{45, 23}_1 ∧  b^{45, 23}_0 ∧ true) 
c  in CNF:
c     b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ false 
c  in DIMACS:
 16544 -16545 -16546  0
c  -3 does not represent an automaton state.
c    -( b^{45, 23}_2 ∧  b^{45, 23}_1 ∧  b^{45, 23}_0 ∧ true) 
c  in CNF:
c    -b^{45, 23}_2 ∨ -b^{45, 23}_1 ∨ -b^{45, 23}_0 ∨ false 
c  in DIMACS:
-16544 -16545 -16546  0

c i = 24
c  -2+1 --> -1
c    ( b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧  p_1080) -> ( b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0)
c  in CNF:
c    -b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨  b^{45, 25}_2
c    -b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_1
c    -b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨  b^{45, 25}_0
c  in DIMACS:
-16547 -16548  16549 -1080  16550 0
-16547 -16548  16549 -1080 -16551 0
-16547 -16548  16549 -1080  16552 0

c  -1+1 --> 0
c    ( b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0 ∧  p_1080) -> (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧ -b^{45, 25}_0)
c  in CNF:
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_2
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_1
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_0
c  in DIMACS:
-16547  16548 -16549 -1080 -16550 0
-16547  16548 -16549 -1080 -16551 0
-16547  16548 -16549 -1080 -16552 0

c  0+1 --> 1
c    (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧  p_1080) -> (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0)
c  in CNF:
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_2
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_1
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨  b^{45, 25}_0
c  in DIMACS:
 16547  16548  16549 -1080 -16550 0
 16547  16548  16549 -1080 -16551 0
 16547  16548  16549 -1080  16552 0

c  1+1 --> 2
c    (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0 ∧  p_1080) -> (-b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0)
c  in CNF:
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_2
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨  b^{45, 25}_1
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ -p_1080 ∨ -b^{45, 25}_0
c  in DIMACS:
 16547  16548 -16549 -1080 -16550 0
 16547  16548 -16549 -1080  16551 0
 16547  16548 -16549 -1080 -16552 0

c  2+1 --> break 
c    (-b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 16547 -16548  16549 -1080 1162 0


c  2-1 --> 1
c    (-b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧ -p_1080) -> (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0)
c  in CNF:
c     b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_2
c     b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_1
c     b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨  b^{45, 25}_0
c  in DIMACS:
 16547 -16548  16549  1080 -16550 0
 16547 -16548  16549  1080 -16551 0
 16547 -16548  16549  1080  16552 0

c  1-1 --> 0
c    (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0 ∧ -p_1080) -> (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧ -b^{45, 25}_0)
c  in CNF:
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_2
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_1
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_0
c  in DIMACS:
 16547  16548 -16549  1080 -16550 0
 16547  16548 -16549  1080 -16551 0
 16547  16548 -16549  1080 -16552 0

c  0-1 --> -1
c    (-b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧ -p_1080) -> ( b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0)
c  in CNF:
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨  b^{45, 25}_2
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_1
c     b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨  b^{45, 25}_0
c  in DIMACS:
 16547  16548  16549  1080  16550 0
 16547  16548  16549  1080 -16551 0
 16547  16548  16549  1080  16552 0

c  -1-1 --> -2
c    ( b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧  b^{45, 24}_0 ∧ -p_1080) -> ( b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0)
c  in CNF:
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨  b^{45, 25}_2
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨  b^{45, 25}_1
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨  p_1080 ∨ -b^{45, 25}_0
c  in DIMACS:
-16547  16548 -16549  1080  16550 0
-16547  16548 -16549  1080  16551 0
-16547  16548 -16549  1080 -16552 0

c  -2-1 --> break 
c    ( b^{45, 24}_2 ∧  b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨  b^{45, 24}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-16547 -16548  16549  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 24}_2 ∧ -b^{45, 24}_1 ∧ -b^{45, 24}_0 ∧ true) 
c  in CNF:
c    -b^{45, 24}_2 ∨  b^{45, 24}_1 ∨  b^{45, 24}_0 ∨ false 
c  in DIMACS:
-16547  16548  16549  0

c  3 does not represent an automaton state.
c    -(-b^{45, 24}_2 ∧  b^{45, 24}_1 ∧  b^{45, 24}_0 ∧ true) 
c  in CNF:
c     b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ false 
c  in DIMACS:
 16547 -16548 -16549  0
c  -3 does not represent an automaton state.
c    -( b^{45, 24}_2 ∧  b^{45, 24}_1 ∧  b^{45, 24}_0 ∧ true) 
c  in CNF:
c    -b^{45, 24}_2 ∨ -b^{45, 24}_1 ∨ -b^{45, 24}_0 ∨ false 
c  in DIMACS:
-16547 -16548 -16549  0

c i = 25
c  -2+1 --> -1
c    ( b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧  p_1125) -> ( b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧  b^{45, 26}_0)
c  in CNF:
c    -b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨  b^{45, 26}_2
c    -b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_1
c    -b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨  b^{45, 26}_0
c  in DIMACS:
-16550 -16551  16552 -1125  16553 0
-16550 -16551  16552 -1125 -16554 0
-16550 -16551  16552 -1125  16555 0

c  -1+1 --> 0
c    ( b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0 ∧  p_1125) -> (-b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧ -b^{45, 26}_0)
c  in CNF:
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_2
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_1
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_0
c  in DIMACS:
-16550  16551 -16552 -1125 -16553 0
-16550  16551 -16552 -1125 -16554 0
-16550  16551 -16552 -1125 -16555 0

c  0+1 --> 1
c    (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧  p_1125) -> (-b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧  b^{45, 26}_0)
c  in CNF:
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_2
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_1
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨  b^{45, 26}_0
c  in DIMACS:
 16550  16551  16552 -1125 -16553 0
 16550  16551  16552 -1125 -16554 0
 16550  16551  16552 -1125  16555 0

c  1+1 --> 2
c    (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0 ∧  p_1125) -> (-b^{45, 26}_2 ∧  b^{45, 26}_1 ∧ -b^{45, 26}_0)
c  in CNF:
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_2
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨  b^{45, 26}_1
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ -p_1125 ∨ -b^{45, 26}_0
c  in DIMACS:
 16550  16551 -16552 -1125 -16553 0
 16550  16551 -16552 -1125  16554 0
 16550  16551 -16552 -1125 -16555 0

c  2+1 --> break 
c    (-b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 16550 -16551  16552 -1125 1162 0


c  2-1 --> 1
c    (-b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧ -p_1125) -> (-b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧  b^{45, 26}_0)
c  in CNF:
c     b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_2
c     b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_1
c     b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨  b^{45, 26}_0
c  in DIMACS:
 16550 -16551  16552  1125 -16553 0
 16550 -16551  16552  1125 -16554 0
 16550 -16551  16552  1125  16555 0

c  1-1 --> 0
c    (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0 ∧ -p_1125) -> (-b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧ -b^{45, 26}_0)
c  in CNF:
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_2
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_1
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_0
c  in DIMACS:
 16550  16551 -16552  1125 -16553 0
 16550  16551 -16552  1125 -16554 0
 16550  16551 -16552  1125 -16555 0

c  0-1 --> -1
c    (-b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧ -p_1125) -> ( b^{45, 26}_2 ∧ -b^{45, 26}_1 ∧  b^{45, 26}_0)
c  in CNF:
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨  b^{45, 26}_2
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_1
c     b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨  b^{45, 26}_0
c  in DIMACS:
 16550  16551  16552  1125  16553 0
 16550  16551  16552  1125 -16554 0
 16550  16551  16552  1125  16555 0

c  -1-1 --> -2
c    ( b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧  b^{45, 25}_0 ∧ -p_1125) -> ( b^{45, 26}_2 ∧  b^{45, 26}_1 ∧ -b^{45, 26}_0)
c  in CNF:
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨  b^{45, 26}_2
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨  b^{45, 26}_1
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨  p_1125 ∨ -b^{45, 26}_0
c  in DIMACS:
-16550  16551 -16552  1125  16553 0
-16550  16551 -16552  1125  16554 0
-16550  16551 -16552  1125 -16555 0

c  -2-1 --> break 
c    ( b^{45, 25}_2 ∧  b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨  b^{45, 25}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-16550 -16551  16552  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{45, 25}_2 ∧ -b^{45, 25}_1 ∧ -b^{45, 25}_0 ∧ true) 
c  in CNF:
c    -b^{45, 25}_2 ∨  b^{45, 25}_1 ∨  b^{45, 25}_0 ∨ false 
c  in DIMACS:
-16550  16551  16552  0

c  3 does not represent an automaton state.
c    -(-b^{45, 25}_2 ∧  b^{45, 25}_1 ∧  b^{45, 25}_0 ∧ true) 
c  in CNF:
c     b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ false 
c  in DIMACS:
 16550 -16551 -16552  0
c  -3 does not represent an automaton state.
c    -( b^{45, 25}_2 ∧  b^{45, 25}_1 ∧  b^{45, 25}_0 ∧ true) 
c  in CNF:
c    -b^{45, 25}_2 ∨ -b^{45, 25}_1 ∨ -b^{45, 25}_0 ∨ false 
c  in DIMACS:
-16550 -16551 -16552  0

c INIT for k = 46
c    -b^{46, 1}_2
c    -b^{46, 1}_1
c    -b^{46, 1}_0
c  in DIMACS:
-16556 0
-16557 0
-16558 0

c Transitions for k = 46
c i = 1
c  -2+1 --> -1
c    ( b^{46, 1}_2 ∧  b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧  p_46) -> ( b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0)
c  in CNF:
c    -b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨  b^{46, 2}_2
c    -b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_1
c    -b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨  b^{46, 2}_0
c  in DIMACS:
-16556 -16557  16558 -46  16559 0
-16556 -16557  16558 -46 -16560 0
-16556 -16557  16558 -46  16561 0

c  -1+1 --> 0
c    ( b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧  b^{46, 1}_0 ∧  p_46) -> (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧ -b^{46, 2}_0)
c  in CNF:
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_2
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_1
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_0
c  in DIMACS:
-16556  16557 -16558 -46 -16559 0
-16556  16557 -16558 -46 -16560 0
-16556  16557 -16558 -46 -16561 0

c  0+1 --> 1
c    (-b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧  p_46) -> (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0)
c  in CNF:
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_2
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_1
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨  b^{46, 2}_0
c  in DIMACS:
 16556  16557  16558 -46 -16559 0
 16556  16557  16558 -46 -16560 0
 16556  16557  16558 -46  16561 0

c  1+1 --> 2
c    (-b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧  b^{46, 1}_0 ∧  p_46) -> (-b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0)
c  in CNF:
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_2
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨  b^{46, 2}_1
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ -p_46 ∨ -b^{46, 2}_0
c  in DIMACS:
 16556  16557 -16558 -46 -16559 0
 16556  16557 -16558 -46  16560 0
 16556  16557 -16558 -46 -16561 0

c  2+1 --> break 
c    (-b^{46, 1}_2 ∧  b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧  p_46) -> break
c  in CNF:
c     b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ -p_46 ∨ break
c  in DIMACS:
 16556 -16557  16558 -46 1162 0


c  2-1 --> 1
c    (-b^{46, 1}_2 ∧  b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧ -p_46) -> (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0)
c  in CNF:
c     b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_2
c     b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_1
c     b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨  b^{46, 2}_0
c  in DIMACS:
 16556 -16557  16558  46 -16559 0
 16556 -16557  16558  46 -16560 0
 16556 -16557  16558  46  16561 0

c  1-1 --> 0
c    (-b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧  b^{46, 1}_0 ∧ -p_46) -> (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧ -b^{46, 2}_0)
c  in CNF:
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_2
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_1
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_0
c  in DIMACS:
 16556  16557 -16558  46 -16559 0
 16556  16557 -16558  46 -16560 0
 16556  16557 -16558  46 -16561 0

c  0-1 --> -1
c    (-b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧ -p_46) -> ( b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0)
c  in CNF:
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨  b^{46, 2}_2
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_1
c     b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨  b^{46, 2}_0
c  in DIMACS:
 16556  16557  16558  46  16559 0
 16556  16557  16558  46 -16560 0
 16556  16557  16558  46  16561 0

c  -1-1 --> -2
c    ( b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧  b^{46, 1}_0 ∧ -p_46) -> ( b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0)
c  in CNF:
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨  b^{46, 2}_2
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨  b^{46, 2}_1
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨  p_46 ∨ -b^{46, 2}_0
c  in DIMACS:
-16556  16557 -16558  46  16559 0
-16556  16557 -16558  46  16560 0
-16556  16557 -16558  46 -16561 0

c  -2-1 --> break 
c    ( b^{46, 1}_2 ∧  b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧ -p_46) -> break
c  in CNF:
c    -b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨  b^{46, 1}_0 ∨  p_46 ∨ break
c  in DIMACS:
-16556 -16557  16558  46 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 1}_2 ∧ -b^{46, 1}_1 ∧ -b^{46, 1}_0 ∧ true) 
c  in CNF:
c    -b^{46, 1}_2 ∨  b^{46, 1}_1 ∨  b^{46, 1}_0 ∨ false 
c  in DIMACS:
-16556  16557  16558  0

c  3 does not represent an automaton state.
c    -(-b^{46, 1}_2 ∧  b^{46, 1}_1 ∧  b^{46, 1}_0 ∧ true) 
c  in CNF:
c     b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ false 
c  in DIMACS:
 16556 -16557 -16558  0
c  -3 does not represent an automaton state.
c    -( b^{46, 1}_2 ∧  b^{46, 1}_1 ∧  b^{46, 1}_0 ∧ true) 
c  in CNF:
c    -b^{46, 1}_2 ∨ -b^{46, 1}_1 ∨ -b^{46, 1}_0 ∨ false 
c  in DIMACS:
-16556 -16557 -16558  0

c i = 2
c  -2+1 --> -1
c    ( b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧  p_92) -> ( b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0)
c  in CNF:
c    -b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨  b^{46, 3}_2
c    -b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_1
c    -b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨  b^{46, 3}_0
c  in DIMACS:
-16559 -16560  16561 -92  16562 0
-16559 -16560  16561 -92 -16563 0
-16559 -16560  16561 -92  16564 0

c  -1+1 --> 0
c    ( b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0 ∧  p_92) -> (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧ -b^{46, 3}_0)
c  in CNF:
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_2
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_1
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_0
c  in DIMACS:
-16559  16560 -16561 -92 -16562 0
-16559  16560 -16561 -92 -16563 0
-16559  16560 -16561 -92 -16564 0

c  0+1 --> 1
c    (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧  p_92) -> (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0)
c  in CNF:
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_2
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_1
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨  b^{46, 3}_0
c  in DIMACS:
 16559  16560  16561 -92 -16562 0
 16559  16560  16561 -92 -16563 0
 16559  16560  16561 -92  16564 0

c  1+1 --> 2
c    (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0 ∧  p_92) -> (-b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0)
c  in CNF:
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_2
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨  b^{46, 3}_1
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ -p_92 ∨ -b^{46, 3}_0
c  in DIMACS:
 16559  16560 -16561 -92 -16562 0
 16559  16560 -16561 -92  16563 0
 16559  16560 -16561 -92 -16564 0

c  2+1 --> break 
c    (-b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧  p_92) -> break
c  in CNF:
c     b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 16559 -16560  16561 -92 1162 0


c  2-1 --> 1
c    (-b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧ -p_92) -> (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0)
c  in CNF:
c     b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_2
c     b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_1
c     b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨  b^{46, 3}_0
c  in DIMACS:
 16559 -16560  16561  92 -16562 0
 16559 -16560  16561  92 -16563 0
 16559 -16560  16561  92  16564 0

c  1-1 --> 0
c    (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0 ∧ -p_92) -> (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧ -b^{46, 3}_0)
c  in CNF:
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_2
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_1
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_0
c  in DIMACS:
 16559  16560 -16561  92 -16562 0
 16559  16560 -16561  92 -16563 0
 16559  16560 -16561  92 -16564 0

c  0-1 --> -1
c    (-b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧ -p_92) -> ( b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0)
c  in CNF:
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨  b^{46, 3}_2
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_1
c     b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨  b^{46, 3}_0
c  in DIMACS:
 16559  16560  16561  92  16562 0
 16559  16560  16561  92 -16563 0
 16559  16560  16561  92  16564 0

c  -1-1 --> -2
c    ( b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧  b^{46, 2}_0 ∧ -p_92) -> ( b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0)
c  in CNF:
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨  b^{46, 3}_2
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨  b^{46, 3}_1
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨  p_92 ∨ -b^{46, 3}_0
c  in DIMACS:
-16559  16560 -16561  92  16562 0
-16559  16560 -16561  92  16563 0
-16559  16560 -16561  92 -16564 0

c  -2-1 --> break 
c    ( b^{46, 2}_2 ∧  b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨  b^{46, 2}_0 ∨  p_92 ∨ break
c  in DIMACS:
-16559 -16560  16561  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 2}_2 ∧ -b^{46, 2}_1 ∧ -b^{46, 2}_0 ∧ true) 
c  in CNF:
c    -b^{46, 2}_2 ∨  b^{46, 2}_1 ∨  b^{46, 2}_0 ∨ false 
c  in DIMACS:
-16559  16560  16561  0

c  3 does not represent an automaton state.
c    -(-b^{46, 2}_2 ∧  b^{46, 2}_1 ∧  b^{46, 2}_0 ∧ true) 
c  in CNF:
c     b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ false 
c  in DIMACS:
 16559 -16560 -16561  0
c  -3 does not represent an automaton state.
c    -( b^{46, 2}_2 ∧  b^{46, 2}_1 ∧  b^{46, 2}_0 ∧ true) 
c  in CNF:
c    -b^{46, 2}_2 ∨ -b^{46, 2}_1 ∨ -b^{46, 2}_0 ∨ false 
c  in DIMACS:
-16559 -16560 -16561  0

c i = 3
c  -2+1 --> -1
c    ( b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧  p_138) -> ( b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0)
c  in CNF:
c    -b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨  b^{46, 4}_2
c    -b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_1
c    -b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨  b^{46, 4}_0
c  in DIMACS:
-16562 -16563  16564 -138  16565 0
-16562 -16563  16564 -138 -16566 0
-16562 -16563  16564 -138  16567 0

c  -1+1 --> 0
c    ( b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0 ∧  p_138) -> (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧ -b^{46, 4}_0)
c  in CNF:
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_2
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_1
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_0
c  in DIMACS:
-16562  16563 -16564 -138 -16565 0
-16562  16563 -16564 -138 -16566 0
-16562  16563 -16564 -138 -16567 0

c  0+1 --> 1
c    (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧  p_138) -> (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0)
c  in CNF:
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_2
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_1
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨  b^{46, 4}_0
c  in DIMACS:
 16562  16563  16564 -138 -16565 0
 16562  16563  16564 -138 -16566 0
 16562  16563  16564 -138  16567 0

c  1+1 --> 2
c    (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0 ∧  p_138) -> (-b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0)
c  in CNF:
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_2
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨  b^{46, 4}_1
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ -p_138 ∨ -b^{46, 4}_0
c  in DIMACS:
 16562  16563 -16564 -138 -16565 0
 16562  16563 -16564 -138  16566 0
 16562  16563 -16564 -138 -16567 0

c  2+1 --> break 
c    (-b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧  p_138) -> break
c  in CNF:
c     b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 16562 -16563  16564 -138 1162 0


c  2-1 --> 1
c    (-b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧ -p_138) -> (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0)
c  in CNF:
c     b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_2
c     b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_1
c     b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨  b^{46, 4}_0
c  in DIMACS:
 16562 -16563  16564  138 -16565 0
 16562 -16563  16564  138 -16566 0
 16562 -16563  16564  138  16567 0

c  1-1 --> 0
c    (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0 ∧ -p_138) -> (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧ -b^{46, 4}_0)
c  in CNF:
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_2
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_1
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_0
c  in DIMACS:
 16562  16563 -16564  138 -16565 0
 16562  16563 -16564  138 -16566 0
 16562  16563 -16564  138 -16567 0

c  0-1 --> -1
c    (-b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧ -p_138) -> ( b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0)
c  in CNF:
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨  b^{46, 4}_2
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_1
c     b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨  b^{46, 4}_0
c  in DIMACS:
 16562  16563  16564  138  16565 0
 16562  16563  16564  138 -16566 0
 16562  16563  16564  138  16567 0

c  -1-1 --> -2
c    ( b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧  b^{46, 3}_0 ∧ -p_138) -> ( b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0)
c  in CNF:
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨  b^{46, 4}_2
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨  b^{46, 4}_1
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨  p_138 ∨ -b^{46, 4}_0
c  in DIMACS:
-16562  16563 -16564  138  16565 0
-16562  16563 -16564  138  16566 0
-16562  16563 -16564  138 -16567 0

c  -2-1 --> break 
c    ( b^{46, 3}_2 ∧  b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨  b^{46, 3}_0 ∨  p_138 ∨ break
c  in DIMACS:
-16562 -16563  16564  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 3}_2 ∧ -b^{46, 3}_1 ∧ -b^{46, 3}_0 ∧ true) 
c  in CNF:
c    -b^{46, 3}_2 ∨  b^{46, 3}_1 ∨  b^{46, 3}_0 ∨ false 
c  in DIMACS:
-16562  16563  16564  0

c  3 does not represent an automaton state.
c    -(-b^{46, 3}_2 ∧  b^{46, 3}_1 ∧  b^{46, 3}_0 ∧ true) 
c  in CNF:
c     b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ false 
c  in DIMACS:
 16562 -16563 -16564  0
c  -3 does not represent an automaton state.
c    -( b^{46, 3}_2 ∧  b^{46, 3}_1 ∧  b^{46, 3}_0 ∧ true) 
c  in CNF:
c    -b^{46, 3}_2 ∨ -b^{46, 3}_1 ∨ -b^{46, 3}_0 ∨ false 
c  in DIMACS:
-16562 -16563 -16564  0

c i = 4
c  -2+1 --> -1
c    ( b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧  p_184) -> ( b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0)
c  in CNF:
c    -b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨  b^{46, 5}_2
c    -b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_1
c    -b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨  b^{46, 5}_0
c  in DIMACS:
-16565 -16566  16567 -184  16568 0
-16565 -16566  16567 -184 -16569 0
-16565 -16566  16567 -184  16570 0

c  -1+1 --> 0
c    ( b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0 ∧  p_184) -> (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧ -b^{46, 5}_0)
c  in CNF:
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_2
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_1
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_0
c  in DIMACS:
-16565  16566 -16567 -184 -16568 0
-16565  16566 -16567 -184 -16569 0
-16565  16566 -16567 -184 -16570 0

c  0+1 --> 1
c    (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧  p_184) -> (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0)
c  in CNF:
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_2
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_1
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨  b^{46, 5}_0
c  in DIMACS:
 16565  16566  16567 -184 -16568 0
 16565  16566  16567 -184 -16569 0
 16565  16566  16567 -184  16570 0

c  1+1 --> 2
c    (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0 ∧  p_184) -> (-b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0)
c  in CNF:
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_2
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨  b^{46, 5}_1
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ -p_184 ∨ -b^{46, 5}_0
c  in DIMACS:
 16565  16566 -16567 -184 -16568 0
 16565  16566 -16567 -184  16569 0
 16565  16566 -16567 -184 -16570 0

c  2+1 --> break 
c    (-b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧  p_184) -> break
c  in CNF:
c     b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 16565 -16566  16567 -184 1162 0


c  2-1 --> 1
c    (-b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧ -p_184) -> (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0)
c  in CNF:
c     b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_2
c     b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_1
c     b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨  b^{46, 5}_0
c  in DIMACS:
 16565 -16566  16567  184 -16568 0
 16565 -16566  16567  184 -16569 0
 16565 -16566  16567  184  16570 0

c  1-1 --> 0
c    (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0 ∧ -p_184) -> (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧ -b^{46, 5}_0)
c  in CNF:
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_2
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_1
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_0
c  in DIMACS:
 16565  16566 -16567  184 -16568 0
 16565  16566 -16567  184 -16569 0
 16565  16566 -16567  184 -16570 0

c  0-1 --> -1
c    (-b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧ -p_184) -> ( b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0)
c  in CNF:
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨  b^{46, 5}_2
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_1
c     b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨  b^{46, 5}_0
c  in DIMACS:
 16565  16566  16567  184  16568 0
 16565  16566  16567  184 -16569 0
 16565  16566  16567  184  16570 0

c  -1-1 --> -2
c    ( b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧  b^{46, 4}_0 ∧ -p_184) -> ( b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0)
c  in CNF:
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨  b^{46, 5}_2
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨  b^{46, 5}_1
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨  p_184 ∨ -b^{46, 5}_0
c  in DIMACS:
-16565  16566 -16567  184  16568 0
-16565  16566 -16567  184  16569 0
-16565  16566 -16567  184 -16570 0

c  -2-1 --> break 
c    ( b^{46, 4}_2 ∧  b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨  b^{46, 4}_0 ∨  p_184 ∨ break
c  in DIMACS:
-16565 -16566  16567  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 4}_2 ∧ -b^{46, 4}_1 ∧ -b^{46, 4}_0 ∧ true) 
c  in CNF:
c    -b^{46, 4}_2 ∨  b^{46, 4}_1 ∨  b^{46, 4}_0 ∨ false 
c  in DIMACS:
-16565  16566  16567  0

c  3 does not represent an automaton state.
c    -(-b^{46, 4}_2 ∧  b^{46, 4}_1 ∧  b^{46, 4}_0 ∧ true) 
c  in CNF:
c     b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ false 
c  in DIMACS:
 16565 -16566 -16567  0
c  -3 does not represent an automaton state.
c    -( b^{46, 4}_2 ∧  b^{46, 4}_1 ∧  b^{46, 4}_0 ∧ true) 
c  in CNF:
c    -b^{46, 4}_2 ∨ -b^{46, 4}_1 ∨ -b^{46, 4}_0 ∨ false 
c  in DIMACS:
-16565 -16566 -16567  0

c i = 5
c  -2+1 --> -1
c    ( b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧  p_230) -> ( b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0)
c  in CNF:
c    -b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨  b^{46, 6}_2
c    -b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_1
c    -b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨  b^{46, 6}_0
c  in DIMACS:
-16568 -16569  16570 -230  16571 0
-16568 -16569  16570 -230 -16572 0
-16568 -16569  16570 -230  16573 0

c  -1+1 --> 0
c    ( b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0 ∧  p_230) -> (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧ -b^{46, 6}_0)
c  in CNF:
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_2
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_1
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_0
c  in DIMACS:
-16568  16569 -16570 -230 -16571 0
-16568  16569 -16570 -230 -16572 0
-16568  16569 -16570 -230 -16573 0

c  0+1 --> 1
c    (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧  p_230) -> (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0)
c  in CNF:
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_2
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_1
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨  b^{46, 6}_0
c  in DIMACS:
 16568  16569  16570 -230 -16571 0
 16568  16569  16570 -230 -16572 0
 16568  16569  16570 -230  16573 0

c  1+1 --> 2
c    (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0 ∧  p_230) -> (-b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0)
c  in CNF:
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_2
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨  b^{46, 6}_1
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ -p_230 ∨ -b^{46, 6}_0
c  in DIMACS:
 16568  16569 -16570 -230 -16571 0
 16568  16569 -16570 -230  16572 0
 16568  16569 -16570 -230 -16573 0

c  2+1 --> break 
c    (-b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧  p_230) -> break
c  in CNF:
c     b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 16568 -16569  16570 -230 1162 0


c  2-1 --> 1
c    (-b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧ -p_230) -> (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0)
c  in CNF:
c     b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_2
c     b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_1
c     b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨  b^{46, 6}_0
c  in DIMACS:
 16568 -16569  16570  230 -16571 0
 16568 -16569  16570  230 -16572 0
 16568 -16569  16570  230  16573 0

c  1-1 --> 0
c    (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0 ∧ -p_230) -> (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧ -b^{46, 6}_0)
c  in CNF:
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_2
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_1
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_0
c  in DIMACS:
 16568  16569 -16570  230 -16571 0
 16568  16569 -16570  230 -16572 0
 16568  16569 -16570  230 -16573 0

c  0-1 --> -1
c    (-b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧ -p_230) -> ( b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0)
c  in CNF:
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨  b^{46, 6}_2
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_1
c     b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨  b^{46, 6}_0
c  in DIMACS:
 16568  16569  16570  230  16571 0
 16568  16569  16570  230 -16572 0
 16568  16569  16570  230  16573 0

c  -1-1 --> -2
c    ( b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧  b^{46, 5}_0 ∧ -p_230) -> ( b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0)
c  in CNF:
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨  b^{46, 6}_2
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨  b^{46, 6}_1
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨  p_230 ∨ -b^{46, 6}_0
c  in DIMACS:
-16568  16569 -16570  230  16571 0
-16568  16569 -16570  230  16572 0
-16568  16569 -16570  230 -16573 0

c  -2-1 --> break 
c    ( b^{46, 5}_2 ∧  b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨  b^{46, 5}_0 ∨  p_230 ∨ break
c  in DIMACS:
-16568 -16569  16570  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 5}_2 ∧ -b^{46, 5}_1 ∧ -b^{46, 5}_0 ∧ true) 
c  in CNF:
c    -b^{46, 5}_2 ∨  b^{46, 5}_1 ∨  b^{46, 5}_0 ∨ false 
c  in DIMACS:
-16568  16569  16570  0

c  3 does not represent an automaton state.
c    -(-b^{46, 5}_2 ∧  b^{46, 5}_1 ∧  b^{46, 5}_0 ∧ true) 
c  in CNF:
c     b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ false 
c  in DIMACS:
 16568 -16569 -16570  0
c  -3 does not represent an automaton state.
c    -( b^{46, 5}_2 ∧  b^{46, 5}_1 ∧  b^{46, 5}_0 ∧ true) 
c  in CNF:
c    -b^{46, 5}_2 ∨ -b^{46, 5}_1 ∨ -b^{46, 5}_0 ∨ false 
c  in DIMACS:
-16568 -16569 -16570  0

c i = 6
c  -2+1 --> -1
c    ( b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧  p_276) -> ( b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0)
c  in CNF:
c    -b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨  b^{46, 7}_2
c    -b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_1
c    -b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨  b^{46, 7}_0
c  in DIMACS:
-16571 -16572  16573 -276  16574 0
-16571 -16572  16573 -276 -16575 0
-16571 -16572  16573 -276  16576 0

c  -1+1 --> 0
c    ( b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0 ∧  p_276) -> (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧ -b^{46, 7}_0)
c  in CNF:
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_2
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_1
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_0
c  in DIMACS:
-16571  16572 -16573 -276 -16574 0
-16571  16572 -16573 -276 -16575 0
-16571  16572 -16573 -276 -16576 0

c  0+1 --> 1
c    (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧  p_276) -> (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0)
c  in CNF:
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_2
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_1
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨  b^{46, 7}_0
c  in DIMACS:
 16571  16572  16573 -276 -16574 0
 16571  16572  16573 -276 -16575 0
 16571  16572  16573 -276  16576 0

c  1+1 --> 2
c    (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0 ∧  p_276) -> (-b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0)
c  in CNF:
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_2
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨  b^{46, 7}_1
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ -p_276 ∨ -b^{46, 7}_0
c  in DIMACS:
 16571  16572 -16573 -276 -16574 0
 16571  16572 -16573 -276  16575 0
 16571  16572 -16573 -276 -16576 0

c  2+1 --> break 
c    (-b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧  p_276) -> break
c  in CNF:
c     b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 16571 -16572  16573 -276 1162 0


c  2-1 --> 1
c    (-b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧ -p_276) -> (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0)
c  in CNF:
c     b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_2
c     b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_1
c     b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨  b^{46, 7}_0
c  in DIMACS:
 16571 -16572  16573  276 -16574 0
 16571 -16572  16573  276 -16575 0
 16571 -16572  16573  276  16576 0

c  1-1 --> 0
c    (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0 ∧ -p_276) -> (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧ -b^{46, 7}_0)
c  in CNF:
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_2
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_1
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_0
c  in DIMACS:
 16571  16572 -16573  276 -16574 0
 16571  16572 -16573  276 -16575 0
 16571  16572 -16573  276 -16576 0

c  0-1 --> -1
c    (-b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧ -p_276) -> ( b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0)
c  in CNF:
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨  b^{46, 7}_2
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_1
c     b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨  b^{46, 7}_0
c  in DIMACS:
 16571  16572  16573  276  16574 0
 16571  16572  16573  276 -16575 0
 16571  16572  16573  276  16576 0

c  -1-1 --> -2
c    ( b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧  b^{46, 6}_0 ∧ -p_276) -> ( b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0)
c  in CNF:
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨  b^{46, 7}_2
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨  b^{46, 7}_1
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨  p_276 ∨ -b^{46, 7}_0
c  in DIMACS:
-16571  16572 -16573  276  16574 0
-16571  16572 -16573  276  16575 0
-16571  16572 -16573  276 -16576 0

c  -2-1 --> break 
c    ( b^{46, 6}_2 ∧  b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨  b^{46, 6}_0 ∨  p_276 ∨ break
c  in DIMACS:
-16571 -16572  16573  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 6}_2 ∧ -b^{46, 6}_1 ∧ -b^{46, 6}_0 ∧ true) 
c  in CNF:
c    -b^{46, 6}_2 ∨  b^{46, 6}_1 ∨  b^{46, 6}_0 ∨ false 
c  in DIMACS:
-16571  16572  16573  0

c  3 does not represent an automaton state.
c    -(-b^{46, 6}_2 ∧  b^{46, 6}_1 ∧  b^{46, 6}_0 ∧ true) 
c  in CNF:
c     b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ false 
c  in DIMACS:
 16571 -16572 -16573  0
c  -3 does not represent an automaton state.
c    -( b^{46, 6}_2 ∧  b^{46, 6}_1 ∧  b^{46, 6}_0 ∧ true) 
c  in CNF:
c    -b^{46, 6}_2 ∨ -b^{46, 6}_1 ∨ -b^{46, 6}_0 ∨ false 
c  in DIMACS:
-16571 -16572 -16573  0

c i = 7
c  -2+1 --> -1
c    ( b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧  p_322) -> ( b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0)
c  in CNF:
c    -b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨  b^{46, 8}_2
c    -b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_1
c    -b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨  b^{46, 8}_0
c  in DIMACS:
-16574 -16575  16576 -322  16577 0
-16574 -16575  16576 -322 -16578 0
-16574 -16575  16576 -322  16579 0

c  -1+1 --> 0
c    ( b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0 ∧  p_322) -> (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧ -b^{46, 8}_0)
c  in CNF:
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_2
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_1
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_0
c  in DIMACS:
-16574  16575 -16576 -322 -16577 0
-16574  16575 -16576 -322 -16578 0
-16574  16575 -16576 -322 -16579 0

c  0+1 --> 1
c    (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧  p_322) -> (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0)
c  in CNF:
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_2
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_1
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨  b^{46, 8}_0
c  in DIMACS:
 16574  16575  16576 -322 -16577 0
 16574  16575  16576 -322 -16578 0
 16574  16575  16576 -322  16579 0

c  1+1 --> 2
c    (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0 ∧  p_322) -> (-b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0)
c  in CNF:
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_2
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨  b^{46, 8}_1
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ -p_322 ∨ -b^{46, 8}_0
c  in DIMACS:
 16574  16575 -16576 -322 -16577 0
 16574  16575 -16576 -322  16578 0
 16574  16575 -16576 -322 -16579 0

c  2+1 --> break 
c    (-b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧  p_322) -> break
c  in CNF:
c     b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 16574 -16575  16576 -322 1162 0


c  2-1 --> 1
c    (-b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧ -p_322) -> (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0)
c  in CNF:
c     b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_2
c     b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_1
c     b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨  b^{46, 8}_0
c  in DIMACS:
 16574 -16575  16576  322 -16577 0
 16574 -16575  16576  322 -16578 0
 16574 -16575  16576  322  16579 0

c  1-1 --> 0
c    (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0 ∧ -p_322) -> (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧ -b^{46, 8}_0)
c  in CNF:
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_2
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_1
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_0
c  in DIMACS:
 16574  16575 -16576  322 -16577 0
 16574  16575 -16576  322 -16578 0
 16574  16575 -16576  322 -16579 0

c  0-1 --> -1
c    (-b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧ -p_322) -> ( b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0)
c  in CNF:
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨  b^{46, 8}_2
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_1
c     b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨  b^{46, 8}_0
c  in DIMACS:
 16574  16575  16576  322  16577 0
 16574  16575  16576  322 -16578 0
 16574  16575  16576  322  16579 0

c  -1-1 --> -2
c    ( b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧  b^{46, 7}_0 ∧ -p_322) -> ( b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0)
c  in CNF:
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨  b^{46, 8}_2
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨  b^{46, 8}_1
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨  p_322 ∨ -b^{46, 8}_0
c  in DIMACS:
-16574  16575 -16576  322  16577 0
-16574  16575 -16576  322  16578 0
-16574  16575 -16576  322 -16579 0

c  -2-1 --> break 
c    ( b^{46, 7}_2 ∧  b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨  b^{46, 7}_0 ∨  p_322 ∨ break
c  in DIMACS:
-16574 -16575  16576  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 7}_2 ∧ -b^{46, 7}_1 ∧ -b^{46, 7}_0 ∧ true) 
c  in CNF:
c    -b^{46, 7}_2 ∨  b^{46, 7}_1 ∨  b^{46, 7}_0 ∨ false 
c  in DIMACS:
-16574  16575  16576  0

c  3 does not represent an automaton state.
c    -(-b^{46, 7}_2 ∧  b^{46, 7}_1 ∧  b^{46, 7}_0 ∧ true) 
c  in CNF:
c     b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ false 
c  in DIMACS:
 16574 -16575 -16576  0
c  -3 does not represent an automaton state.
c    -( b^{46, 7}_2 ∧  b^{46, 7}_1 ∧  b^{46, 7}_0 ∧ true) 
c  in CNF:
c    -b^{46, 7}_2 ∨ -b^{46, 7}_1 ∨ -b^{46, 7}_0 ∨ false 
c  in DIMACS:
-16574 -16575 -16576  0

c i = 8
c  -2+1 --> -1
c    ( b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧  p_368) -> ( b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0)
c  in CNF:
c    -b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨  b^{46, 9}_2
c    -b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_1
c    -b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨  b^{46, 9}_0
c  in DIMACS:
-16577 -16578  16579 -368  16580 0
-16577 -16578  16579 -368 -16581 0
-16577 -16578  16579 -368  16582 0

c  -1+1 --> 0
c    ( b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0 ∧  p_368) -> (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧ -b^{46, 9}_0)
c  in CNF:
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_2
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_1
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_0
c  in DIMACS:
-16577  16578 -16579 -368 -16580 0
-16577  16578 -16579 -368 -16581 0
-16577  16578 -16579 -368 -16582 0

c  0+1 --> 1
c    (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧  p_368) -> (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0)
c  in CNF:
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_2
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_1
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨  b^{46, 9}_0
c  in DIMACS:
 16577  16578  16579 -368 -16580 0
 16577  16578  16579 -368 -16581 0
 16577  16578  16579 -368  16582 0

c  1+1 --> 2
c    (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0 ∧  p_368) -> (-b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0)
c  in CNF:
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_2
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨  b^{46, 9}_1
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ -p_368 ∨ -b^{46, 9}_0
c  in DIMACS:
 16577  16578 -16579 -368 -16580 0
 16577  16578 -16579 -368  16581 0
 16577  16578 -16579 -368 -16582 0

c  2+1 --> break 
c    (-b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧  p_368) -> break
c  in CNF:
c     b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 16577 -16578  16579 -368 1162 0


c  2-1 --> 1
c    (-b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧ -p_368) -> (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0)
c  in CNF:
c     b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_2
c     b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_1
c     b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨  b^{46, 9}_0
c  in DIMACS:
 16577 -16578  16579  368 -16580 0
 16577 -16578  16579  368 -16581 0
 16577 -16578  16579  368  16582 0

c  1-1 --> 0
c    (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0 ∧ -p_368) -> (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧ -b^{46, 9}_0)
c  in CNF:
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_2
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_1
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_0
c  in DIMACS:
 16577  16578 -16579  368 -16580 0
 16577  16578 -16579  368 -16581 0
 16577  16578 -16579  368 -16582 0

c  0-1 --> -1
c    (-b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧ -p_368) -> ( b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0)
c  in CNF:
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨  b^{46, 9}_2
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_1
c     b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨  b^{46, 9}_0
c  in DIMACS:
 16577  16578  16579  368  16580 0
 16577  16578  16579  368 -16581 0
 16577  16578  16579  368  16582 0

c  -1-1 --> -2
c    ( b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧  b^{46, 8}_0 ∧ -p_368) -> ( b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0)
c  in CNF:
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨  b^{46, 9}_2
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨  b^{46, 9}_1
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨  p_368 ∨ -b^{46, 9}_0
c  in DIMACS:
-16577  16578 -16579  368  16580 0
-16577  16578 -16579  368  16581 0
-16577  16578 -16579  368 -16582 0

c  -2-1 --> break 
c    ( b^{46, 8}_2 ∧  b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨  b^{46, 8}_0 ∨  p_368 ∨ break
c  in DIMACS:
-16577 -16578  16579  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 8}_2 ∧ -b^{46, 8}_1 ∧ -b^{46, 8}_0 ∧ true) 
c  in CNF:
c    -b^{46, 8}_2 ∨  b^{46, 8}_1 ∨  b^{46, 8}_0 ∨ false 
c  in DIMACS:
-16577  16578  16579  0

c  3 does not represent an automaton state.
c    -(-b^{46, 8}_2 ∧  b^{46, 8}_1 ∧  b^{46, 8}_0 ∧ true) 
c  in CNF:
c     b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ false 
c  in DIMACS:
 16577 -16578 -16579  0
c  -3 does not represent an automaton state.
c    -( b^{46, 8}_2 ∧  b^{46, 8}_1 ∧  b^{46, 8}_0 ∧ true) 
c  in CNF:
c    -b^{46, 8}_2 ∨ -b^{46, 8}_1 ∨ -b^{46, 8}_0 ∨ false 
c  in DIMACS:
-16577 -16578 -16579  0

c i = 9
c  -2+1 --> -1
c    ( b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧  p_414) -> ( b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0)
c  in CNF:
c    -b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨  b^{46, 10}_2
c    -b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_1
c    -b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨  b^{46, 10}_0
c  in DIMACS:
-16580 -16581  16582 -414  16583 0
-16580 -16581  16582 -414 -16584 0
-16580 -16581  16582 -414  16585 0

c  -1+1 --> 0
c    ( b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0 ∧  p_414) -> (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧ -b^{46, 10}_0)
c  in CNF:
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_2
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_1
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_0
c  in DIMACS:
-16580  16581 -16582 -414 -16583 0
-16580  16581 -16582 -414 -16584 0
-16580  16581 -16582 -414 -16585 0

c  0+1 --> 1
c    (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧  p_414) -> (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0)
c  in CNF:
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_2
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_1
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨  b^{46, 10}_0
c  in DIMACS:
 16580  16581  16582 -414 -16583 0
 16580  16581  16582 -414 -16584 0
 16580  16581  16582 -414  16585 0

c  1+1 --> 2
c    (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0 ∧  p_414) -> (-b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0)
c  in CNF:
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_2
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨  b^{46, 10}_1
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ -p_414 ∨ -b^{46, 10}_0
c  in DIMACS:
 16580  16581 -16582 -414 -16583 0
 16580  16581 -16582 -414  16584 0
 16580  16581 -16582 -414 -16585 0

c  2+1 --> break 
c    (-b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧  p_414) -> break
c  in CNF:
c     b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 16580 -16581  16582 -414 1162 0


c  2-1 --> 1
c    (-b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧ -p_414) -> (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0)
c  in CNF:
c     b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_2
c     b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_1
c     b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨  b^{46, 10}_0
c  in DIMACS:
 16580 -16581  16582  414 -16583 0
 16580 -16581  16582  414 -16584 0
 16580 -16581  16582  414  16585 0

c  1-1 --> 0
c    (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0 ∧ -p_414) -> (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧ -b^{46, 10}_0)
c  in CNF:
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_2
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_1
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_0
c  in DIMACS:
 16580  16581 -16582  414 -16583 0
 16580  16581 -16582  414 -16584 0
 16580  16581 -16582  414 -16585 0

c  0-1 --> -1
c    (-b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧ -p_414) -> ( b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0)
c  in CNF:
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨  b^{46, 10}_2
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_1
c     b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨  b^{46, 10}_0
c  in DIMACS:
 16580  16581  16582  414  16583 0
 16580  16581  16582  414 -16584 0
 16580  16581  16582  414  16585 0

c  -1-1 --> -2
c    ( b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧  b^{46, 9}_0 ∧ -p_414) -> ( b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0)
c  in CNF:
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨  b^{46, 10}_2
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨  b^{46, 10}_1
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨  p_414 ∨ -b^{46, 10}_0
c  in DIMACS:
-16580  16581 -16582  414  16583 0
-16580  16581 -16582  414  16584 0
-16580  16581 -16582  414 -16585 0

c  -2-1 --> break 
c    ( b^{46, 9}_2 ∧  b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨  b^{46, 9}_0 ∨  p_414 ∨ break
c  in DIMACS:
-16580 -16581  16582  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 9}_2 ∧ -b^{46, 9}_1 ∧ -b^{46, 9}_0 ∧ true) 
c  in CNF:
c    -b^{46, 9}_2 ∨  b^{46, 9}_1 ∨  b^{46, 9}_0 ∨ false 
c  in DIMACS:
-16580  16581  16582  0

c  3 does not represent an automaton state.
c    -(-b^{46, 9}_2 ∧  b^{46, 9}_1 ∧  b^{46, 9}_0 ∧ true) 
c  in CNF:
c     b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ false 
c  in DIMACS:
 16580 -16581 -16582  0
c  -3 does not represent an automaton state.
c    -( b^{46, 9}_2 ∧  b^{46, 9}_1 ∧  b^{46, 9}_0 ∧ true) 
c  in CNF:
c    -b^{46, 9}_2 ∨ -b^{46, 9}_1 ∨ -b^{46, 9}_0 ∨ false 
c  in DIMACS:
-16580 -16581 -16582  0

c i = 10
c  -2+1 --> -1
c    ( b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧  p_460) -> ( b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0)
c  in CNF:
c    -b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨  b^{46, 11}_2
c    -b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_1
c    -b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨  b^{46, 11}_0
c  in DIMACS:
-16583 -16584  16585 -460  16586 0
-16583 -16584  16585 -460 -16587 0
-16583 -16584  16585 -460  16588 0

c  -1+1 --> 0
c    ( b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0 ∧  p_460) -> (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧ -b^{46, 11}_0)
c  in CNF:
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_2
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_1
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_0
c  in DIMACS:
-16583  16584 -16585 -460 -16586 0
-16583  16584 -16585 -460 -16587 0
-16583  16584 -16585 -460 -16588 0

c  0+1 --> 1
c    (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧  p_460) -> (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0)
c  in CNF:
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_2
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_1
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨  b^{46, 11}_0
c  in DIMACS:
 16583  16584  16585 -460 -16586 0
 16583  16584  16585 -460 -16587 0
 16583  16584  16585 -460  16588 0

c  1+1 --> 2
c    (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0 ∧  p_460) -> (-b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0)
c  in CNF:
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_2
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨  b^{46, 11}_1
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ -p_460 ∨ -b^{46, 11}_0
c  in DIMACS:
 16583  16584 -16585 -460 -16586 0
 16583  16584 -16585 -460  16587 0
 16583  16584 -16585 -460 -16588 0

c  2+1 --> break 
c    (-b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧  p_460) -> break
c  in CNF:
c     b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 16583 -16584  16585 -460 1162 0


c  2-1 --> 1
c    (-b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧ -p_460) -> (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0)
c  in CNF:
c     b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_2
c     b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_1
c     b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨  b^{46, 11}_0
c  in DIMACS:
 16583 -16584  16585  460 -16586 0
 16583 -16584  16585  460 -16587 0
 16583 -16584  16585  460  16588 0

c  1-1 --> 0
c    (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0 ∧ -p_460) -> (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧ -b^{46, 11}_0)
c  in CNF:
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_2
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_1
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_0
c  in DIMACS:
 16583  16584 -16585  460 -16586 0
 16583  16584 -16585  460 -16587 0
 16583  16584 -16585  460 -16588 0

c  0-1 --> -1
c    (-b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧ -p_460) -> ( b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0)
c  in CNF:
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨  b^{46, 11}_2
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_1
c     b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨  b^{46, 11}_0
c  in DIMACS:
 16583  16584  16585  460  16586 0
 16583  16584  16585  460 -16587 0
 16583  16584  16585  460  16588 0

c  -1-1 --> -2
c    ( b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧  b^{46, 10}_0 ∧ -p_460) -> ( b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0)
c  in CNF:
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨  b^{46, 11}_2
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨  b^{46, 11}_1
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨  p_460 ∨ -b^{46, 11}_0
c  in DIMACS:
-16583  16584 -16585  460  16586 0
-16583  16584 -16585  460  16587 0
-16583  16584 -16585  460 -16588 0

c  -2-1 --> break 
c    ( b^{46, 10}_2 ∧  b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨  b^{46, 10}_0 ∨  p_460 ∨ break
c  in DIMACS:
-16583 -16584  16585  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 10}_2 ∧ -b^{46, 10}_1 ∧ -b^{46, 10}_0 ∧ true) 
c  in CNF:
c    -b^{46, 10}_2 ∨  b^{46, 10}_1 ∨  b^{46, 10}_0 ∨ false 
c  in DIMACS:
-16583  16584  16585  0

c  3 does not represent an automaton state.
c    -(-b^{46, 10}_2 ∧  b^{46, 10}_1 ∧  b^{46, 10}_0 ∧ true) 
c  in CNF:
c     b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ false 
c  in DIMACS:
 16583 -16584 -16585  0
c  -3 does not represent an automaton state.
c    -( b^{46, 10}_2 ∧  b^{46, 10}_1 ∧  b^{46, 10}_0 ∧ true) 
c  in CNF:
c    -b^{46, 10}_2 ∨ -b^{46, 10}_1 ∨ -b^{46, 10}_0 ∨ false 
c  in DIMACS:
-16583 -16584 -16585  0

c i = 11
c  -2+1 --> -1
c    ( b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧  p_506) -> ( b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0)
c  in CNF:
c    -b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨  b^{46, 12}_2
c    -b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_1
c    -b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨  b^{46, 12}_0
c  in DIMACS:
-16586 -16587  16588 -506  16589 0
-16586 -16587  16588 -506 -16590 0
-16586 -16587  16588 -506  16591 0

c  -1+1 --> 0
c    ( b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0 ∧  p_506) -> (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧ -b^{46, 12}_0)
c  in CNF:
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_2
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_1
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_0
c  in DIMACS:
-16586  16587 -16588 -506 -16589 0
-16586  16587 -16588 -506 -16590 0
-16586  16587 -16588 -506 -16591 0

c  0+1 --> 1
c    (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧  p_506) -> (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0)
c  in CNF:
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_2
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_1
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨  b^{46, 12}_0
c  in DIMACS:
 16586  16587  16588 -506 -16589 0
 16586  16587  16588 -506 -16590 0
 16586  16587  16588 -506  16591 0

c  1+1 --> 2
c    (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0 ∧  p_506) -> (-b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0)
c  in CNF:
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_2
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨  b^{46, 12}_1
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ -p_506 ∨ -b^{46, 12}_0
c  in DIMACS:
 16586  16587 -16588 -506 -16589 0
 16586  16587 -16588 -506  16590 0
 16586  16587 -16588 -506 -16591 0

c  2+1 --> break 
c    (-b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧  p_506) -> break
c  in CNF:
c     b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 16586 -16587  16588 -506 1162 0


c  2-1 --> 1
c    (-b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧ -p_506) -> (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0)
c  in CNF:
c     b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_2
c     b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_1
c     b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨  b^{46, 12}_0
c  in DIMACS:
 16586 -16587  16588  506 -16589 0
 16586 -16587  16588  506 -16590 0
 16586 -16587  16588  506  16591 0

c  1-1 --> 0
c    (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0 ∧ -p_506) -> (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧ -b^{46, 12}_0)
c  in CNF:
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_2
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_1
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_0
c  in DIMACS:
 16586  16587 -16588  506 -16589 0
 16586  16587 -16588  506 -16590 0
 16586  16587 -16588  506 -16591 0

c  0-1 --> -1
c    (-b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧ -p_506) -> ( b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0)
c  in CNF:
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨  b^{46, 12}_2
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_1
c     b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨  b^{46, 12}_0
c  in DIMACS:
 16586  16587  16588  506  16589 0
 16586  16587  16588  506 -16590 0
 16586  16587  16588  506  16591 0

c  -1-1 --> -2
c    ( b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧  b^{46, 11}_0 ∧ -p_506) -> ( b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0)
c  in CNF:
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨  b^{46, 12}_2
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨  b^{46, 12}_1
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨  p_506 ∨ -b^{46, 12}_0
c  in DIMACS:
-16586  16587 -16588  506  16589 0
-16586  16587 -16588  506  16590 0
-16586  16587 -16588  506 -16591 0

c  -2-1 --> break 
c    ( b^{46, 11}_2 ∧  b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨  b^{46, 11}_0 ∨  p_506 ∨ break
c  in DIMACS:
-16586 -16587  16588  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 11}_2 ∧ -b^{46, 11}_1 ∧ -b^{46, 11}_0 ∧ true) 
c  in CNF:
c    -b^{46, 11}_2 ∨  b^{46, 11}_1 ∨  b^{46, 11}_0 ∨ false 
c  in DIMACS:
-16586  16587  16588  0

c  3 does not represent an automaton state.
c    -(-b^{46, 11}_2 ∧  b^{46, 11}_1 ∧  b^{46, 11}_0 ∧ true) 
c  in CNF:
c     b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ false 
c  in DIMACS:
 16586 -16587 -16588  0
c  -3 does not represent an automaton state.
c    -( b^{46, 11}_2 ∧  b^{46, 11}_1 ∧  b^{46, 11}_0 ∧ true) 
c  in CNF:
c    -b^{46, 11}_2 ∨ -b^{46, 11}_1 ∨ -b^{46, 11}_0 ∨ false 
c  in DIMACS:
-16586 -16587 -16588  0

c i = 12
c  -2+1 --> -1
c    ( b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧  p_552) -> ( b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0)
c  in CNF:
c    -b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨  b^{46, 13}_2
c    -b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_1
c    -b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨  b^{46, 13}_0
c  in DIMACS:
-16589 -16590  16591 -552  16592 0
-16589 -16590  16591 -552 -16593 0
-16589 -16590  16591 -552  16594 0

c  -1+1 --> 0
c    ( b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0 ∧  p_552) -> (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧ -b^{46, 13}_0)
c  in CNF:
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_2
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_1
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_0
c  in DIMACS:
-16589  16590 -16591 -552 -16592 0
-16589  16590 -16591 -552 -16593 0
-16589  16590 -16591 -552 -16594 0

c  0+1 --> 1
c    (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧  p_552) -> (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0)
c  in CNF:
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_2
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_1
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨  b^{46, 13}_0
c  in DIMACS:
 16589  16590  16591 -552 -16592 0
 16589  16590  16591 -552 -16593 0
 16589  16590  16591 -552  16594 0

c  1+1 --> 2
c    (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0 ∧  p_552) -> (-b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0)
c  in CNF:
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_2
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨  b^{46, 13}_1
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ -p_552 ∨ -b^{46, 13}_0
c  in DIMACS:
 16589  16590 -16591 -552 -16592 0
 16589  16590 -16591 -552  16593 0
 16589  16590 -16591 -552 -16594 0

c  2+1 --> break 
c    (-b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧  p_552) -> break
c  in CNF:
c     b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 16589 -16590  16591 -552 1162 0


c  2-1 --> 1
c    (-b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧ -p_552) -> (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0)
c  in CNF:
c     b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_2
c     b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_1
c     b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨  b^{46, 13}_0
c  in DIMACS:
 16589 -16590  16591  552 -16592 0
 16589 -16590  16591  552 -16593 0
 16589 -16590  16591  552  16594 0

c  1-1 --> 0
c    (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0 ∧ -p_552) -> (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧ -b^{46, 13}_0)
c  in CNF:
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_2
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_1
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_0
c  in DIMACS:
 16589  16590 -16591  552 -16592 0
 16589  16590 -16591  552 -16593 0
 16589  16590 -16591  552 -16594 0

c  0-1 --> -1
c    (-b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧ -p_552) -> ( b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0)
c  in CNF:
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨  b^{46, 13}_2
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_1
c     b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨  b^{46, 13}_0
c  in DIMACS:
 16589  16590  16591  552  16592 0
 16589  16590  16591  552 -16593 0
 16589  16590  16591  552  16594 0

c  -1-1 --> -2
c    ( b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧  b^{46, 12}_0 ∧ -p_552) -> ( b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0)
c  in CNF:
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨  b^{46, 13}_2
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨  b^{46, 13}_1
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨  p_552 ∨ -b^{46, 13}_0
c  in DIMACS:
-16589  16590 -16591  552  16592 0
-16589  16590 -16591  552  16593 0
-16589  16590 -16591  552 -16594 0

c  -2-1 --> break 
c    ( b^{46, 12}_2 ∧  b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨  b^{46, 12}_0 ∨  p_552 ∨ break
c  in DIMACS:
-16589 -16590  16591  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 12}_2 ∧ -b^{46, 12}_1 ∧ -b^{46, 12}_0 ∧ true) 
c  in CNF:
c    -b^{46, 12}_2 ∨  b^{46, 12}_1 ∨  b^{46, 12}_0 ∨ false 
c  in DIMACS:
-16589  16590  16591  0

c  3 does not represent an automaton state.
c    -(-b^{46, 12}_2 ∧  b^{46, 12}_1 ∧  b^{46, 12}_0 ∧ true) 
c  in CNF:
c     b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ false 
c  in DIMACS:
 16589 -16590 -16591  0
c  -3 does not represent an automaton state.
c    -( b^{46, 12}_2 ∧  b^{46, 12}_1 ∧  b^{46, 12}_0 ∧ true) 
c  in CNF:
c    -b^{46, 12}_2 ∨ -b^{46, 12}_1 ∨ -b^{46, 12}_0 ∨ false 
c  in DIMACS:
-16589 -16590 -16591  0

c i = 13
c  -2+1 --> -1
c    ( b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧  p_598) -> ( b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0)
c  in CNF:
c    -b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨  b^{46, 14}_2
c    -b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_1
c    -b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨  b^{46, 14}_0
c  in DIMACS:
-16592 -16593  16594 -598  16595 0
-16592 -16593  16594 -598 -16596 0
-16592 -16593  16594 -598  16597 0

c  -1+1 --> 0
c    ( b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0 ∧  p_598) -> (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧ -b^{46, 14}_0)
c  in CNF:
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_2
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_1
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_0
c  in DIMACS:
-16592  16593 -16594 -598 -16595 0
-16592  16593 -16594 -598 -16596 0
-16592  16593 -16594 -598 -16597 0

c  0+1 --> 1
c    (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧  p_598) -> (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0)
c  in CNF:
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_2
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_1
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨  b^{46, 14}_0
c  in DIMACS:
 16592  16593  16594 -598 -16595 0
 16592  16593  16594 -598 -16596 0
 16592  16593  16594 -598  16597 0

c  1+1 --> 2
c    (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0 ∧  p_598) -> (-b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0)
c  in CNF:
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_2
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨  b^{46, 14}_1
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ -p_598 ∨ -b^{46, 14}_0
c  in DIMACS:
 16592  16593 -16594 -598 -16595 0
 16592  16593 -16594 -598  16596 0
 16592  16593 -16594 -598 -16597 0

c  2+1 --> break 
c    (-b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧  p_598) -> break
c  in CNF:
c     b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 16592 -16593  16594 -598 1162 0


c  2-1 --> 1
c    (-b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧ -p_598) -> (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0)
c  in CNF:
c     b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_2
c     b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_1
c     b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨  b^{46, 14}_0
c  in DIMACS:
 16592 -16593  16594  598 -16595 0
 16592 -16593  16594  598 -16596 0
 16592 -16593  16594  598  16597 0

c  1-1 --> 0
c    (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0 ∧ -p_598) -> (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧ -b^{46, 14}_0)
c  in CNF:
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_2
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_1
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_0
c  in DIMACS:
 16592  16593 -16594  598 -16595 0
 16592  16593 -16594  598 -16596 0
 16592  16593 -16594  598 -16597 0

c  0-1 --> -1
c    (-b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧ -p_598) -> ( b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0)
c  in CNF:
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨  b^{46, 14}_2
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_1
c     b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨  b^{46, 14}_0
c  in DIMACS:
 16592  16593  16594  598  16595 0
 16592  16593  16594  598 -16596 0
 16592  16593  16594  598  16597 0

c  -1-1 --> -2
c    ( b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧  b^{46, 13}_0 ∧ -p_598) -> ( b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0)
c  in CNF:
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨  b^{46, 14}_2
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨  b^{46, 14}_1
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨  p_598 ∨ -b^{46, 14}_0
c  in DIMACS:
-16592  16593 -16594  598  16595 0
-16592  16593 -16594  598  16596 0
-16592  16593 -16594  598 -16597 0

c  -2-1 --> break 
c    ( b^{46, 13}_2 ∧  b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨  b^{46, 13}_0 ∨  p_598 ∨ break
c  in DIMACS:
-16592 -16593  16594  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 13}_2 ∧ -b^{46, 13}_1 ∧ -b^{46, 13}_0 ∧ true) 
c  in CNF:
c    -b^{46, 13}_2 ∨  b^{46, 13}_1 ∨  b^{46, 13}_0 ∨ false 
c  in DIMACS:
-16592  16593  16594  0

c  3 does not represent an automaton state.
c    -(-b^{46, 13}_2 ∧  b^{46, 13}_1 ∧  b^{46, 13}_0 ∧ true) 
c  in CNF:
c     b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ false 
c  in DIMACS:
 16592 -16593 -16594  0
c  -3 does not represent an automaton state.
c    -( b^{46, 13}_2 ∧  b^{46, 13}_1 ∧  b^{46, 13}_0 ∧ true) 
c  in CNF:
c    -b^{46, 13}_2 ∨ -b^{46, 13}_1 ∨ -b^{46, 13}_0 ∨ false 
c  in DIMACS:
-16592 -16593 -16594  0

c i = 14
c  -2+1 --> -1
c    ( b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧  p_644) -> ( b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0)
c  in CNF:
c    -b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨  b^{46, 15}_2
c    -b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_1
c    -b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨  b^{46, 15}_0
c  in DIMACS:
-16595 -16596  16597 -644  16598 0
-16595 -16596  16597 -644 -16599 0
-16595 -16596  16597 -644  16600 0

c  -1+1 --> 0
c    ( b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0 ∧  p_644) -> (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧ -b^{46, 15}_0)
c  in CNF:
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_2
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_1
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_0
c  in DIMACS:
-16595  16596 -16597 -644 -16598 0
-16595  16596 -16597 -644 -16599 0
-16595  16596 -16597 -644 -16600 0

c  0+1 --> 1
c    (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧  p_644) -> (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0)
c  in CNF:
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_2
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_1
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨  b^{46, 15}_0
c  in DIMACS:
 16595  16596  16597 -644 -16598 0
 16595  16596  16597 -644 -16599 0
 16595  16596  16597 -644  16600 0

c  1+1 --> 2
c    (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0 ∧  p_644) -> (-b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0)
c  in CNF:
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_2
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨  b^{46, 15}_1
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ -p_644 ∨ -b^{46, 15}_0
c  in DIMACS:
 16595  16596 -16597 -644 -16598 0
 16595  16596 -16597 -644  16599 0
 16595  16596 -16597 -644 -16600 0

c  2+1 --> break 
c    (-b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧  p_644) -> break
c  in CNF:
c     b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 16595 -16596  16597 -644 1162 0


c  2-1 --> 1
c    (-b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧ -p_644) -> (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0)
c  in CNF:
c     b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_2
c     b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_1
c     b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨  b^{46, 15}_0
c  in DIMACS:
 16595 -16596  16597  644 -16598 0
 16595 -16596  16597  644 -16599 0
 16595 -16596  16597  644  16600 0

c  1-1 --> 0
c    (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0 ∧ -p_644) -> (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧ -b^{46, 15}_0)
c  in CNF:
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_2
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_1
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_0
c  in DIMACS:
 16595  16596 -16597  644 -16598 0
 16595  16596 -16597  644 -16599 0
 16595  16596 -16597  644 -16600 0

c  0-1 --> -1
c    (-b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧ -p_644) -> ( b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0)
c  in CNF:
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨  b^{46, 15}_2
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_1
c     b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨  b^{46, 15}_0
c  in DIMACS:
 16595  16596  16597  644  16598 0
 16595  16596  16597  644 -16599 0
 16595  16596  16597  644  16600 0

c  -1-1 --> -2
c    ( b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧  b^{46, 14}_0 ∧ -p_644) -> ( b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0)
c  in CNF:
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨  b^{46, 15}_2
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨  b^{46, 15}_1
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨  p_644 ∨ -b^{46, 15}_0
c  in DIMACS:
-16595  16596 -16597  644  16598 0
-16595  16596 -16597  644  16599 0
-16595  16596 -16597  644 -16600 0

c  -2-1 --> break 
c    ( b^{46, 14}_2 ∧  b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨  b^{46, 14}_0 ∨  p_644 ∨ break
c  in DIMACS:
-16595 -16596  16597  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 14}_2 ∧ -b^{46, 14}_1 ∧ -b^{46, 14}_0 ∧ true) 
c  in CNF:
c    -b^{46, 14}_2 ∨  b^{46, 14}_1 ∨  b^{46, 14}_0 ∨ false 
c  in DIMACS:
-16595  16596  16597  0

c  3 does not represent an automaton state.
c    -(-b^{46, 14}_2 ∧  b^{46, 14}_1 ∧  b^{46, 14}_0 ∧ true) 
c  in CNF:
c     b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ false 
c  in DIMACS:
 16595 -16596 -16597  0
c  -3 does not represent an automaton state.
c    -( b^{46, 14}_2 ∧  b^{46, 14}_1 ∧  b^{46, 14}_0 ∧ true) 
c  in CNF:
c    -b^{46, 14}_2 ∨ -b^{46, 14}_1 ∨ -b^{46, 14}_0 ∨ false 
c  in DIMACS:
-16595 -16596 -16597  0

c i = 15
c  -2+1 --> -1
c    ( b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧  p_690) -> ( b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0)
c  in CNF:
c    -b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨  b^{46, 16}_2
c    -b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_1
c    -b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨  b^{46, 16}_0
c  in DIMACS:
-16598 -16599  16600 -690  16601 0
-16598 -16599  16600 -690 -16602 0
-16598 -16599  16600 -690  16603 0

c  -1+1 --> 0
c    ( b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0 ∧  p_690) -> (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧ -b^{46, 16}_0)
c  in CNF:
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_2
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_1
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_0
c  in DIMACS:
-16598  16599 -16600 -690 -16601 0
-16598  16599 -16600 -690 -16602 0
-16598  16599 -16600 -690 -16603 0

c  0+1 --> 1
c    (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧  p_690) -> (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0)
c  in CNF:
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_2
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_1
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨  b^{46, 16}_0
c  in DIMACS:
 16598  16599  16600 -690 -16601 0
 16598  16599  16600 -690 -16602 0
 16598  16599  16600 -690  16603 0

c  1+1 --> 2
c    (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0 ∧  p_690) -> (-b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0)
c  in CNF:
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_2
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨  b^{46, 16}_1
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ -p_690 ∨ -b^{46, 16}_0
c  in DIMACS:
 16598  16599 -16600 -690 -16601 0
 16598  16599 -16600 -690  16602 0
 16598  16599 -16600 -690 -16603 0

c  2+1 --> break 
c    (-b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧  p_690) -> break
c  in CNF:
c     b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 16598 -16599  16600 -690 1162 0


c  2-1 --> 1
c    (-b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧ -p_690) -> (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0)
c  in CNF:
c     b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_2
c     b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_1
c     b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨  b^{46, 16}_0
c  in DIMACS:
 16598 -16599  16600  690 -16601 0
 16598 -16599  16600  690 -16602 0
 16598 -16599  16600  690  16603 0

c  1-1 --> 0
c    (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0 ∧ -p_690) -> (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧ -b^{46, 16}_0)
c  in CNF:
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_2
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_1
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_0
c  in DIMACS:
 16598  16599 -16600  690 -16601 0
 16598  16599 -16600  690 -16602 0
 16598  16599 -16600  690 -16603 0

c  0-1 --> -1
c    (-b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧ -p_690) -> ( b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0)
c  in CNF:
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨  b^{46, 16}_2
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_1
c     b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨  b^{46, 16}_0
c  in DIMACS:
 16598  16599  16600  690  16601 0
 16598  16599  16600  690 -16602 0
 16598  16599  16600  690  16603 0

c  -1-1 --> -2
c    ( b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧  b^{46, 15}_0 ∧ -p_690) -> ( b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0)
c  in CNF:
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨  b^{46, 16}_2
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨  b^{46, 16}_1
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨  p_690 ∨ -b^{46, 16}_0
c  in DIMACS:
-16598  16599 -16600  690  16601 0
-16598  16599 -16600  690  16602 0
-16598  16599 -16600  690 -16603 0

c  -2-1 --> break 
c    ( b^{46, 15}_2 ∧  b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨  b^{46, 15}_0 ∨  p_690 ∨ break
c  in DIMACS:
-16598 -16599  16600  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 15}_2 ∧ -b^{46, 15}_1 ∧ -b^{46, 15}_0 ∧ true) 
c  in CNF:
c    -b^{46, 15}_2 ∨  b^{46, 15}_1 ∨  b^{46, 15}_0 ∨ false 
c  in DIMACS:
-16598  16599  16600  0

c  3 does not represent an automaton state.
c    -(-b^{46, 15}_2 ∧  b^{46, 15}_1 ∧  b^{46, 15}_0 ∧ true) 
c  in CNF:
c     b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ false 
c  in DIMACS:
 16598 -16599 -16600  0
c  -3 does not represent an automaton state.
c    -( b^{46, 15}_2 ∧  b^{46, 15}_1 ∧  b^{46, 15}_0 ∧ true) 
c  in CNF:
c    -b^{46, 15}_2 ∨ -b^{46, 15}_1 ∨ -b^{46, 15}_0 ∨ false 
c  in DIMACS:
-16598 -16599 -16600  0

c i = 16
c  -2+1 --> -1
c    ( b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧  p_736) -> ( b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0)
c  in CNF:
c    -b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨  b^{46, 17}_2
c    -b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_1
c    -b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨  b^{46, 17}_0
c  in DIMACS:
-16601 -16602  16603 -736  16604 0
-16601 -16602  16603 -736 -16605 0
-16601 -16602  16603 -736  16606 0

c  -1+1 --> 0
c    ( b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0 ∧  p_736) -> (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧ -b^{46, 17}_0)
c  in CNF:
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_2
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_1
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_0
c  in DIMACS:
-16601  16602 -16603 -736 -16604 0
-16601  16602 -16603 -736 -16605 0
-16601  16602 -16603 -736 -16606 0

c  0+1 --> 1
c    (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧  p_736) -> (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0)
c  in CNF:
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_2
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_1
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨  b^{46, 17}_0
c  in DIMACS:
 16601  16602  16603 -736 -16604 0
 16601  16602  16603 -736 -16605 0
 16601  16602  16603 -736  16606 0

c  1+1 --> 2
c    (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0 ∧  p_736) -> (-b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0)
c  in CNF:
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_2
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨  b^{46, 17}_1
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ -p_736 ∨ -b^{46, 17}_0
c  in DIMACS:
 16601  16602 -16603 -736 -16604 0
 16601  16602 -16603 -736  16605 0
 16601  16602 -16603 -736 -16606 0

c  2+1 --> break 
c    (-b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧  p_736) -> break
c  in CNF:
c     b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 16601 -16602  16603 -736 1162 0


c  2-1 --> 1
c    (-b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧ -p_736) -> (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0)
c  in CNF:
c     b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_2
c     b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_1
c     b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨  b^{46, 17}_0
c  in DIMACS:
 16601 -16602  16603  736 -16604 0
 16601 -16602  16603  736 -16605 0
 16601 -16602  16603  736  16606 0

c  1-1 --> 0
c    (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0 ∧ -p_736) -> (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧ -b^{46, 17}_0)
c  in CNF:
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_2
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_1
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_0
c  in DIMACS:
 16601  16602 -16603  736 -16604 0
 16601  16602 -16603  736 -16605 0
 16601  16602 -16603  736 -16606 0

c  0-1 --> -1
c    (-b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧ -p_736) -> ( b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0)
c  in CNF:
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨  b^{46, 17}_2
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_1
c     b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨  b^{46, 17}_0
c  in DIMACS:
 16601  16602  16603  736  16604 0
 16601  16602  16603  736 -16605 0
 16601  16602  16603  736  16606 0

c  -1-1 --> -2
c    ( b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧  b^{46, 16}_0 ∧ -p_736) -> ( b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0)
c  in CNF:
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨  b^{46, 17}_2
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨  b^{46, 17}_1
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨  p_736 ∨ -b^{46, 17}_0
c  in DIMACS:
-16601  16602 -16603  736  16604 0
-16601  16602 -16603  736  16605 0
-16601  16602 -16603  736 -16606 0

c  -2-1 --> break 
c    ( b^{46, 16}_2 ∧  b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨  b^{46, 16}_0 ∨  p_736 ∨ break
c  in DIMACS:
-16601 -16602  16603  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 16}_2 ∧ -b^{46, 16}_1 ∧ -b^{46, 16}_0 ∧ true) 
c  in CNF:
c    -b^{46, 16}_2 ∨  b^{46, 16}_1 ∨  b^{46, 16}_0 ∨ false 
c  in DIMACS:
-16601  16602  16603  0

c  3 does not represent an automaton state.
c    -(-b^{46, 16}_2 ∧  b^{46, 16}_1 ∧  b^{46, 16}_0 ∧ true) 
c  in CNF:
c     b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ false 
c  in DIMACS:
 16601 -16602 -16603  0
c  -3 does not represent an automaton state.
c    -( b^{46, 16}_2 ∧  b^{46, 16}_1 ∧  b^{46, 16}_0 ∧ true) 
c  in CNF:
c    -b^{46, 16}_2 ∨ -b^{46, 16}_1 ∨ -b^{46, 16}_0 ∨ false 
c  in DIMACS:
-16601 -16602 -16603  0

c i = 17
c  -2+1 --> -1
c    ( b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧  p_782) -> ( b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0)
c  in CNF:
c    -b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨  b^{46, 18}_2
c    -b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_1
c    -b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨  b^{46, 18}_0
c  in DIMACS:
-16604 -16605  16606 -782  16607 0
-16604 -16605  16606 -782 -16608 0
-16604 -16605  16606 -782  16609 0

c  -1+1 --> 0
c    ( b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0 ∧  p_782) -> (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧ -b^{46, 18}_0)
c  in CNF:
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_2
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_1
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_0
c  in DIMACS:
-16604  16605 -16606 -782 -16607 0
-16604  16605 -16606 -782 -16608 0
-16604  16605 -16606 -782 -16609 0

c  0+1 --> 1
c    (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧  p_782) -> (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0)
c  in CNF:
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_2
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_1
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨  b^{46, 18}_0
c  in DIMACS:
 16604  16605  16606 -782 -16607 0
 16604  16605  16606 -782 -16608 0
 16604  16605  16606 -782  16609 0

c  1+1 --> 2
c    (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0 ∧  p_782) -> (-b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0)
c  in CNF:
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_2
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨  b^{46, 18}_1
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ -p_782 ∨ -b^{46, 18}_0
c  in DIMACS:
 16604  16605 -16606 -782 -16607 0
 16604  16605 -16606 -782  16608 0
 16604  16605 -16606 -782 -16609 0

c  2+1 --> break 
c    (-b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧  p_782) -> break
c  in CNF:
c     b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ -p_782 ∨ break
c  in DIMACS:
 16604 -16605  16606 -782 1162 0


c  2-1 --> 1
c    (-b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧ -p_782) -> (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0)
c  in CNF:
c     b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_2
c     b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_1
c     b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨  b^{46, 18}_0
c  in DIMACS:
 16604 -16605  16606  782 -16607 0
 16604 -16605  16606  782 -16608 0
 16604 -16605  16606  782  16609 0

c  1-1 --> 0
c    (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0 ∧ -p_782) -> (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧ -b^{46, 18}_0)
c  in CNF:
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_2
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_1
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_0
c  in DIMACS:
 16604  16605 -16606  782 -16607 0
 16604  16605 -16606  782 -16608 0
 16604  16605 -16606  782 -16609 0

c  0-1 --> -1
c    (-b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧ -p_782) -> ( b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0)
c  in CNF:
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨  b^{46, 18}_2
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_1
c     b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨  b^{46, 18}_0
c  in DIMACS:
 16604  16605  16606  782  16607 0
 16604  16605  16606  782 -16608 0
 16604  16605  16606  782  16609 0

c  -1-1 --> -2
c    ( b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧  b^{46, 17}_0 ∧ -p_782) -> ( b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0)
c  in CNF:
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨  b^{46, 18}_2
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨  b^{46, 18}_1
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨  p_782 ∨ -b^{46, 18}_0
c  in DIMACS:
-16604  16605 -16606  782  16607 0
-16604  16605 -16606  782  16608 0
-16604  16605 -16606  782 -16609 0

c  -2-1 --> break 
c    ( b^{46, 17}_2 ∧  b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧ -p_782) -> break
c  in CNF:
c    -b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨  b^{46, 17}_0 ∨  p_782 ∨ break
c  in DIMACS:
-16604 -16605  16606  782 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 17}_2 ∧ -b^{46, 17}_1 ∧ -b^{46, 17}_0 ∧ true) 
c  in CNF:
c    -b^{46, 17}_2 ∨  b^{46, 17}_1 ∨  b^{46, 17}_0 ∨ false 
c  in DIMACS:
-16604  16605  16606  0

c  3 does not represent an automaton state.
c    -(-b^{46, 17}_2 ∧  b^{46, 17}_1 ∧  b^{46, 17}_0 ∧ true) 
c  in CNF:
c     b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ false 
c  in DIMACS:
 16604 -16605 -16606  0
c  -3 does not represent an automaton state.
c    -( b^{46, 17}_2 ∧  b^{46, 17}_1 ∧  b^{46, 17}_0 ∧ true) 
c  in CNF:
c    -b^{46, 17}_2 ∨ -b^{46, 17}_1 ∨ -b^{46, 17}_0 ∨ false 
c  in DIMACS:
-16604 -16605 -16606  0

c i = 18
c  -2+1 --> -1
c    ( b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧  p_828) -> ( b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0)
c  in CNF:
c    -b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨  b^{46, 19}_2
c    -b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_1
c    -b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨  b^{46, 19}_0
c  in DIMACS:
-16607 -16608  16609 -828  16610 0
-16607 -16608  16609 -828 -16611 0
-16607 -16608  16609 -828  16612 0

c  -1+1 --> 0
c    ( b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0 ∧  p_828) -> (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧ -b^{46, 19}_0)
c  in CNF:
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_2
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_1
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_0
c  in DIMACS:
-16607  16608 -16609 -828 -16610 0
-16607  16608 -16609 -828 -16611 0
-16607  16608 -16609 -828 -16612 0

c  0+1 --> 1
c    (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧  p_828) -> (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0)
c  in CNF:
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_2
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_1
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨  b^{46, 19}_0
c  in DIMACS:
 16607  16608  16609 -828 -16610 0
 16607  16608  16609 -828 -16611 0
 16607  16608  16609 -828  16612 0

c  1+1 --> 2
c    (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0 ∧  p_828) -> (-b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0)
c  in CNF:
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_2
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨  b^{46, 19}_1
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ -p_828 ∨ -b^{46, 19}_0
c  in DIMACS:
 16607  16608 -16609 -828 -16610 0
 16607  16608 -16609 -828  16611 0
 16607  16608 -16609 -828 -16612 0

c  2+1 --> break 
c    (-b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧  p_828) -> break
c  in CNF:
c     b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 16607 -16608  16609 -828 1162 0


c  2-1 --> 1
c    (-b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧ -p_828) -> (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0)
c  in CNF:
c     b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_2
c     b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_1
c     b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨  b^{46, 19}_0
c  in DIMACS:
 16607 -16608  16609  828 -16610 0
 16607 -16608  16609  828 -16611 0
 16607 -16608  16609  828  16612 0

c  1-1 --> 0
c    (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0 ∧ -p_828) -> (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧ -b^{46, 19}_0)
c  in CNF:
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_2
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_1
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_0
c  in DIMACS:
 16607  16608 -16609  828 -16610 0
 16607  16608 -16609  828 -16611 0
 16607  16608 -16609  828 -16612 0

c  0-1 --> -1
c    (-b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧ -p_828) -> ( b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0)
c  in CNF:
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨  b^{46, 19}_2
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_1
c     b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨  b^{46, 19}_0
c  in DIMACS:
 16607  16608  16609  828  16610 0
 16607  16608  16609  828 -16611 0
 16607  16608  16609  828  16612 0

c  -1-1 --> -2
c    ( b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧  b^{46, 18}_0 ∧ -p_828) -> ( b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0)
c  in CNF:
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨  b^{46, 19}_2
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨  b^{46, 19}_1
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨  p_828 ∨ -b^{46, 19}_0
c  in DIMACS:
-16607  16608 -16609  828  16610 0
-16607  16608 -16609  828  16611 0
-16607  16608 -16609  828 -16612 0

c  -2-1 --> break 
c    ( b^{46, 18}_2 ∧  b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨  b^{46, 18}_0 ∨  p_828 ∨ break
c  in DIMACS:
-16607 -16608  16609  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 18}_2 ∧ -b^{46, 18}_1 ∧ -b^{46, 18}_0 ∧ true) 
c  in CNF:
c    -b^{46, 18}_2 ∨  b^{46, 18}_1 ∨  b^{46, 18}_0 ∨ false 
c  in DIMACS:
-16607  16608  16609  0

c  3 does not represent an automaton state.
c    -(-b^{46, 18}_2 ∧  b^{46, 18}_1 ∧  b^{46, 18}_0 ∧ true) 
c  in CNF:
c     b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ false 
c  in DIMACS:
 16607 -16608 -16609  0
c  -3 does not represent an automaton state.
c    -( b^{46, 18}_2 ∧  b^{46, 18}_1 ∧  b^{46, 18}_0 ∧ true) 
c  in CNF:
c    -b^{46, 18}_2 ∨ -b^{46, 18}_1 ∨ -b^{46, 18}_0 ∨ false 
c  in DIMACS:
-16607 -16608 -16609  0

c i = 19
c  -2+1 --> -1
c    ( b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧  p_874) -> ( b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0)
c  in CNF:
c    -b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨  b^{46, 20}_2
c    -b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_1
c    -b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨  b^{46, 20}_0
c  in DIMACS:
-16610 -16611  16612 -874  16613 0
-16610 -16611  16612 -874 -16614 0
-16610 -16611  16612 -874  16615 0

c  -1+1 --> 0
c    ( b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0 ∧  p_874) -> (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧ -b^{46, 20}_0)
c  in CNF:
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_2
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_1
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_0
c  in DIMACS:
-16610  16611 -16612 -874 -16613 0
-16610  16611 -16612 -874 -16614 0
-16610  16611 -16612 -874 -16615 0

c  0+1 --> 1
c    (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧  p_874) -> (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0)
c  in CNF:
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_2
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_1
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨  b^{46, 20}_0
c  in DIMACS:
 16610  16611  16612 -874 -16613 0
 16610  16611  16612 -874 -16614 0
 16610  16611  16612 -874  16615 0

c  1+1 --> 2
c    (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0 ∧  p_874) -> (-b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0)
c  in CNF:
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_2
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨  b^{46, 20}_1
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ -p_874 ∨ -b^{46, 20}_0
c  in DIMACS:
 16610  16611 -16612 -874 -16613 0
 16610  16611 -16612 -874  16614 0
 16610  16611 -16612 -874 -16615 0

c  2+1 --> break 
c    (-b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧  p_874) -> break
c  in CNF:
c     b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ -p_874 ∨ break
c  in DIMACS:
 16610 -16611  16612 -874 1162 0


c  2-1 --> 1
c    (-b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧ -p_874) -> (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0)
c  in CNF:
c     b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_2
c     b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_1
c     b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨  b^{46, 20}_0
c  in DIMACS:
 16610 -16611  16612  874 -16613 0
 16610 -16611  16612  874 -16614 0
 16610 -16611  16612  874  16615 0

c  1-1 --> 0
c    (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0 ∧ -p_874) -> (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧ -b^{46, 20}_0)
c  in CNF:
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_2
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_1
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_0
c  in DIMACS:
 16610  16611 -16612  874 -16613 0
 16610  16611 -16612  874 -16614 0
 16610  16611 -16612  874 -16615 0

c  0-1 --> -1
c    (-b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧ -p_874) -> ( b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0)
c  in CNF:
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨  b^{46, 20}_2
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_1
c     b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨  b^{46, 20}_0
c  in DIMACS:
 16610  16611  16612  874  16613 0
 16610  16611  16612  874 -16614 0
 16610  16611  16612  874  16615 0

c  -1-1 --> -2
c    ( b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧  b^{46, 19}_0 ∧ -p_874) -> ( b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0)
c  in CNF:
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨  b^{46, 20}_2
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨  b^{46, 20}_1
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨  p_874 ∨ -b^{46, 20}_0
c  in DIMACS:
-16610  16611 -16612  874  16613 0
-16610  16611 -16612  874  16614 0
-16610  16611 -16612  874 -16615 0

c  -2-1 --> break 
c    ( b^{46, 19}_2 ∧  b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧ -p_874) -> break
c  in CNF:
c    -b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨  b^{46, 19}_0 ∨  p_874 ∨ break
c  in DIMACS:
-16610 -16611  16612  874 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 19}_2 ∧ -b^{46, 19}_1 ∧ -b^{46, 19}_0 ∧ true) 
c  in CNF:
c    -b^{46, 19}_2 ∨  b^{46, 19}_1 ∨  b^{46, 19}_0 ∨ false 
c  in DIMACS:
-16610  16611  16612  0

c  3 does not represent an automaton state.
c    -(-b^{46, 19}_2 ∧  b^{46, 19}_1 ∧  b^{46, 19}_0 ∧ true) 
c  in CNF:
c     b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ false 
c  in DIMACS:
 16610 -16611 -16612  0
c  -3 does not represent an automaton state.
c    -( b^{46, 19}_2 ∧  b^{46, 19}_1 ∧  b^{46, 19}_0 ∧ true) 
c  in CNF:
c    -b^{46, 19}_2 ∨ -b^{46, 19}_1 ∨ -b^{46, 19}_0 ∨ false 
c  in DIMACS:
-16610 -16611 -16612  0

c i = 20
c  -2+1 --> -1
c    ( b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧  p_920) -> ( b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0)
c  in CNF:
c    -b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨  b^{46, 21}_2
c    -b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_1
c    -b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨  b^{46, 21}_0
c  in DIMACS:
-16613 -16614  16615 -920  16616 0
-16613 -16614  16615 -920 -16617 0
-16613 -16614  16615 -920  16618 0

c  -1+1 --> 0
c    ( b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0 ∧  p_920) -> (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧ -b^{46, 21}_0)
c  in CNF:
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_2
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_1
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_0
c  in DIMACS:
-16613  16614 -16615 -920 -16616 0
-16613  16614 -16615 -920 -16617 0
-16613  16614 -16615 -920 -16618 0

c  0+1 --> 1
c    (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧  p_920) -> (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0)
c  in CNF:
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_2
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_1
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨  b^{46, 21}_0
c  in DIMACS:
 16613  16614  16615 -920 -16616 0
 16613  16614  16615 -920 -16617 0
 16613  16614  16615 -920  16618 0

c  1+1 --> 2
c    (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0 ∧  p_920) -> (-b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0)
c  in CNF:
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_2
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨  b^{46, 21}_1
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ -p_920 ∨ -b^{46, 21}_0
c  in DIMACS:
 16613  16614 -16615 -920 -16616 0
 16613  16614 -16615 -920  16617 0
 16613  16614 -16615 -920 -16618 0

c  2+1 --> break 
c    (-b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧  p_920) -> break
c  in CNF:
c     b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 16613 -16614  16615 -920 1162 0


c  2-1 --> 1
c    (-b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧ -p_920) -> (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0)
c  in CNF:
c     b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_2
c     b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_1
c     b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨  b^{46, 21}_0
c  in DIMACS:
 16613 -16614  16615  920 -16616 0
 16613 -16614  16615  920 -16617 0
 16613 -16614  16615  920  16618 0

c  1-1 --> 0
c    (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0 ∧ -p_920) -> (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧ -b^{46, 21}_0)
c  in CNF:
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_2
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_1
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_0
c  in DIMACS:
 16613  16614 -16615  920 -16616 0
 16613  16614 -16615  920 -16617 0
 16613  16614 -16615  920 -16618 0

c  0-1 --> -1
c    (-b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧ -p_920) -> ( b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0)
c  in CNF:
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨  b^{46, 21}_2
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_1
c     b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨  b^{46, 21}_0
c  in DIMACS:
 16613  16614  16615  920  16616 0
 16613  16614  16615  920 -16617 0
 16613  16614  16615  920  16618 0

c  -1-1 --> -2
c    ( b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧  b^{46, 20}_0 ∧ -p_920) -> ( b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0)
c  in CNF:
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨  b^{46, 21}_2
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨  b^{46, 21}_1
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨  p_920 ∨ -b^{46, 21}_0
c  in DIMACS:
-16613  16614 -16615  920  16616 0
-16613  16614 -16615  920  16617 0
-16613  16614 -16615  920 -16618 0

c  -2-1 --> break 
c    ( b^{46, 20}_2 ∧  b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨  b^{46, 20}_0 ∨  p_920 ∨ break
c  in DIMACS:
-16613 -16614  16615  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 20}_2 ∧ -b^{46, 20}_1 ∧ -b^{46, 20}_0 ∧ true) 
c  in CNF:
c    -b^{46, 20}_2 ∨  b^{46, 20}_1 ∨  b^{46, 20}_0 ∨ false 
c  in DIMACS:
-16613  16614  16615  0

c  3 does not represent an automaton state.
c    -(-b^{46, 20}_2 ∧  b^{46, 20}_1 ∧  b^{46, 20}_0 ∧ true) 
c  in CNF:
c     b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ false 
c  in DIMACS:
 16613 -16614 -16615  0
c  -3 does not represent an automaton state.
c    -( b^{46, 20}_2 ∧  b^{46, 20}_1 ∧  b^{46, 20}_0 ∧ true) 
c  in CNF:
c    -b^{46, 20}_2 ∨ -b^{46, 20}_1 ∨ -b^{46, 20}_0 ∨ false 
c  in DIMACS:
-16613 -16614 -16615  0

c i = 21
c  -2+1 --> -1
c    ( b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧  p_966) -> ( b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0)
c  in CNF:
c    -b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨  b^{46, 22}_2
c    -b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_1
c    -b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨  b^{46, 22}_0
c  in DIMACS:
-16616 -16617  16618 -966  16619 0
-16616 -16617  16618 -966 -16620 0
-16616 -16617  16618 -966  16621 0

c  -1+1 --> 0
c    ( b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0 ∧  p_966) -> (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧ -b^{46, 22}_0)
c  in CNF:
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_2
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_1
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_0
c  in DIMACS:
-16616  16617 -16618 -966 -16619 0
-16616  16617 -16618 -966 -16620 0
-16616  16617 -16618 -966 -16621 0

c  0+1 --> 1
c    (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧  p_966) -> (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0)
c  in CNF:
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_2
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_1
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨  b^{46, 22}_0
c  in DIMACS:
 16616  16617  16618 -966 -16619 0
 16616  16617  16618 -966 -16620 0
 16616  16617  16618 -966  16621 0

c  1+1 --> 2
c    (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0 ∧  p_966) -> (-b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0)
c  in CNF:
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_2
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨  b^{46, 22}_1
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ -p_966 ∨ -b^{46, 22}_0
c  in DIMACS:
 16616  16617 -16618 -966 -16619 0
 16616  16617 -16618 -966  16620 0
 16616  16617 -16618 -966 -16621 0

c  2+1 --> break 
c    (-b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧  p_966) -> break
c  in CNF:
c     b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 16616 -16617  16618 -966 1162 0


c  2-1 --> 1
c    (-b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧ -p_966) -> (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0)
c  in CNF:
c     b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_2
c     b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_1
c     b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨  b^{46, 22}_0
c  in DIMACS:
 16616 -16617  16618  966 -16619 0
 16616 -16617  16618  966 -16620 0
 16616 -16617  16618  966  16621 0

c  1-1 --> 0
c    (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0 ∧ -p_966) -> (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧ -b^{46, 22}_0)
c  in CNF:
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_2
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_1
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_0
c  in DIMACS:
 16616  16617 -16618  966 -16619 0
 16616  16617 -16618  966 -16620 0
 16616  16617 -16618  966 -16621 0

c  0-1 --> -1
c    (-b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧ -p_966) -> ( b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0)
c  in CNF:
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨  b^{46, 22}_2
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_1
c     b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨  b^{46, 22}_0
c  in DIMACS:
 16616  16617  16618  966  16619 0
 16616  16617  16618  966 -16620 0
 16616  16617  16618  966  16621 0

c  -1-1 --> -2
c    ( b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧  b^{46, 21}_0 ∧ -p_966) -> ( b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0)
c  in CNF:
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨  b^{46, 22}_2
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨  b^{46, 22}_1
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨  p_966 ∨ -b^{46, 22}_0
c  in DIMACS:
-16616  16617 -16618  966  16619 0
-16616  16617 -16618  966  16620 0
-16616  16617 -16618  966 -16621 0

c  -2-1 --> break 
c    ( b^{46, 21}_2 ∧  b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨  b^{46, 21}_0 ∨  p_966 ∨ break
c  in DIMACS:
-16616 -16617  16618  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 21}_2 ∧ -b^{46, 21}_1 ∧ -b^{46, 21}_0 ∧ true) 
c  in CNF:
c    -b^{46, 21}_2 ∨  b^{46, 21}_1 ∨  b^{46, 21}_0 ∨ false 
c  in DIMACS:
-16616  16617  16618  0

c  3 does not represent an automaton state.
c    -(-b^{46, 21}_2 ∧  b^{46, 21}_1 ∧  b^{46, 21}_0 ∧ true) 
c  in CNF:
c     b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ false 
c  in DIMACS:
 16616 -16617 -16618  0
c  -3 does not represent an automaton state.
c    -( b^{46, 21}_2 ∧  b^{46, 21}_1 ∧  b^{46, 21}_0 ∧ true) 
c  in CNF:
c    -b^{46, 21}_2 ∨ -b^{46, 21}_1 ∨ -b^{46, 21}_0 ∨ false 
c  in DIMACS:
-16616 -16617 -16618  0

c i = 22
c  -2+1 --> -1
c    ( b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧  p_1012) -> ( b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0)
c  in CNF:
c    -b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨  b^{46, 23}_2
c    -b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_1
c    -b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨  b^{46, 23}_0
c  in DIMACS:
-16619 -16620  16621 -1012  16622 0
-16619 -16620  16621 -1012 -16623 0
-16619 -16620  16621 -1012  16624 0

c  -1+1 --> 0
c    ( b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0 ∧  p_1012) -> (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧ -b^{46, 23}_0)
c  in CNF:
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_2
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_1
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_0
c  in DIMACS:
-16619  16620 -16621 -1012 -16622 0
-16619  16620 -16621 -1012 -16623 0
-16619  16620 -16621 -1012 -16624 0

c  0+1 --> 1
c    (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧  p_1012) -> (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0)
c  in CNF:
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_2
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_1
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨  b^{46, 23}_0
c  in DIMACS:
 16619  16620  16621 -1012 -16622 0
 16619  16620  16621 -1012 -16623 0
 16619  16620  16621 -1012  16624 0

c  1+1 --> 2
c    (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0 ∧  p_1012) -> (-b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0)
c  in CNF:
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_2
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨  b^{46, 23}_1
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ -p_1012 ∨ -b^{46, 23}_0
c  in DIMACS:
 16619  16620 -16621 -1012 -16622 0
 16619  16620 -16621 -1012  16623 0
 16619  16620 -16621 -1012 -16624 0

c  2+1 --> break 
c    (-b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 16619 -16620  16621 -1012 1162 0


c  2-1 --> 1
c    (-b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧ -p_1012) -> (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0)
c  in CNF:
c     b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_2
c     b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_1
c     b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨  b^{46, 23}_0
c  in DIMACS:
 16619 -16620  16621  1012 -16622 0
 16619 -16620  16621  1012 -16623 0
 16619 -16620  16621  1012  16624 0

c  1-1 --> 0
c    (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0 ∧ -p_1012) -> (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧ -b^{46, 23}_0)
c  in CNF:
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_2
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_1
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_0
c  in DIMACS:
 16619  16620 -16621  1012 -16622 0
 16619  16620 -16621  1012 -16623 0
 16619  16620 -16621  1012 -16624 0

c  0-1 --> -1
c    (-b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧ -p_1012) -> ( b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0)
c  in CNF:
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨  b^{46, 23}_2
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_1
c     b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨  b^{46, 23}_0
c  in DIMACS:
 16619  16620  16621  1012  16622 0
 16619  16620  16621  1012 -16623 0
 16619  16620  16621  1012  16624 0

c  -1-1 --> -2
c    ( b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧  b^{46, 22}_0 ∧ -p_1012) -> ( b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0)
c  in CNF:
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨  b^{46, 23}_2
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨  b^{46, 23}_1
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨  p_1012 ∨ -b^{46, 23}_0
c  in DIMACS:
-16619  16620 -16621  1012  16622 0
-16619  16620 -16621  1012  16623 0
-16619  16620 -16621  1012 -16624 0

c  -2-1 --> break 
c    ( b^{46, 22}_2 ∧  b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨  b^{46, 22}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-16619 -16620  16621  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 22}_2 ∧ -b^{46, 22}_1 ∧ -b^{46, 22}_0 ∧ true) 
c  in CNF:
c    -b^{46, 22}_2 ∨  b^{46, 22}_1 ∨  b^{46, 22}_0 ∨ false 
c  in DIMACS:
-16619  16620  16621  0

c  3 does not represent an automaton state.
c    -(-b^{46, 22}_2 ∧  b^{46, 22}_1 ∧  b^{46, 22}_0 ∧ true) 
c  in CNF:
c     b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ false 
c  in DIMACS:
 16619 -16620 -16621  0
c  -3 does not represent an automaton state.
c    -( b^{46, 22}_2 ∧  b^{46, 22}_1 ∧  b^{46, 22}_0 ∧ true) 
c  in CNF:
c    -b^{46, 22}_2 ∨ -b^{46, 22}_1 ∨ -b^{46, 22}_0 ∨ false 
c  in DIMACS:
-16619 -16620 -16621  0

c i = 23
c  -2+1 --> -1
c    ( b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧  p_1058) -> ( b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0)
c  in CNF:
c    -b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨  b^{46, 24}_2
c    -b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_1
c    -b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨  b^{46, 24}_0
c  in DIMACS:
-16622 -16623  16624 -1058  16625 0
-16622 -16623  16624 -1058 -16626 0
-16622 -16623  16624 -1058  16627 0

c  -1+1 --> 0
c    ( b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0 ∧  p_1058) -> (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧ -b^{46, 24}_0)
c  in CNF:
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_2
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_1
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_0
c  in DIMACS:
-16622  16623 -16624 -1058 -16625 0
-16622  16623 -16624 -1058 -16626 0
-16622  16623 -16624 -1058 -16627 0

c  0+1 --> 1
c    (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧  p_1058) -> (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0)
c  in CNF:
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_2
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_1
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨  b^{46, 24}_0
c  in DIMACS:
 16622  16623  16624 -1058 -16625 0
 16622  16623  16624 -1058 -16626 0
 16622  16623  16624 -1058  16627 0

c  1+1 --> 2
c    (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0 ∧  p_1058) -> (-b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0)
c  in CNF:
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_2
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨  b^{46, 24}_1
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ -p_1058 ∨ -b^{46, 24}_0
c  in DIMACS:
 16622  16623 -16624 -1058 -16625 0
 16622  16623 -16624 -1058  16626 0
 16622  16623 -16624 -1058 -16627 0

c  2+1 --> break 
c    (-b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧  p_1058) -> break
c  in CNF:
c     b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ -p_1058 ∨ break
c  in DIMACS:
 16622 -16623  16624 -1058 1162 0


c  2-1 --> 1
c    (-b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧ -p_1058) -> (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0)
c  in CNF:
c     b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_2
c     b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_1
c     b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨  b^{46, 24}_0
c  in DIMACS:
 16622 -16623  16624  1058 -16625 0
 16622 -16623  16624  1058 -16626 0
 16622 -16623  16624  1058  16627 0

c  1-1 --> 0
c    (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0 ∧ -p_1058) -> (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧ -b^{46, 24}_0)
c  in CNF:
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_2
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_1
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_0
c  in DIMACS:
 16622  16623 -16624  1058 -16625 0
 16622  16623 -16624  1058 -16626 0
 16622  16623 -16624  1058 -16627 0

c  0-1 --> -1
c    (-b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧ -p_1058) -> ( b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0)
c  in CNF:
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨  b^{46, 24}_2
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_1
c     b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨  b^{46, 24}_0
c  in DIMACS:
 16622  16623  16624  1058  16625 0
 16622  16623  16624  1058 -16626 0
 16622  16623  16624  1058  16627 0

c  -1-1 --> -2
c    ( b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧  b^{46, 23}_0 ∧ -p_1058) -> ( b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0)
c  in CNF:
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨  b^{46, 24}_2
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨  b^{46, 24}_1
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨  p_1058 ∨ -b^{46, 24}_0
c  in DIMACS:
-16622  16623 -16624  1058  16625 0
-16622  16623 -16624  1058  16626 0
-16622  16623 -16624  1058 -16627 0

c  -2-1 --> break 
c    ( b^{46, 23}_2 ∧  b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧ -p_1058) -> break
c  in CNF:
c    -b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨  b^{46, 23}_0 ∨  p_1058 ∨ break
c  in DIMACS:
-16622 -16623  16624  1058 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 23}_2 ∧ -b^{46, 23}_1 ∧ -b^{46, 23}_0 ∧ true) 
c  in CNF:
c    -b^{46, 23}_2 ∨  b^{46, 23}_1 ∨  b^{46, 23}_0 ∨ false 
c  in DIMACS:
-16622  16623  16624  0

c  3 does not represent an automaton state.
c    -(-b^{46, 23}_2 ∧  b^{46, 23}_1 ∧  b^{46, 23}_0 ∧ true) 
c  in CNF:
c     b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ false 
c  in DIMACS:
 16622 -16623 -16624  0
c  -3 does not represent an automaton state.
c    -( b^{46, 23}_2 ∧  b^{46, 23}_1 ∧  b^{46, 23}_0 ∧ true) 
c  in CNF:
c    -b^{46, 23}_2 ∨ -b^{46, 23}_1 ∨ -b^{46, 23}_0 ∨ false 
c  in DIMACS:
-16622 -16623 -16624  0

c i = 24
c  -2+1 --> -1
c    ( b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧  p_1104) -> ( b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0)
c  in CNF:
c    -b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨  b^{46, 25}_2
c    -b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_1
c    -b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨  b^{46, 25}_0
c  in DIMACS:
-16625 -16626  16627 -1104  16628 0
-16625 -16626  16627 -1104 -16629 0
-16625 -16626  16627 -1104  16630 0

c  -1+1 --> 0
c    ( b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0 ∧  p_1104) -> (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧ -b^{46, 25}_0)
c  in CNF:
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_2
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_1
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_0
c  in DIMACS:
-16625  16626 -16627 -1104 -16628 0
-16625  16626 -16627 -1104 -16629 0
-16625  16626 -16627 -1104 -16630 0

c  0+1 --> 1
c    (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧  p_1104) -> (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0)
c  in CNF:
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_2
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_1
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨  b^{46, 25}_0
c  in DIMACS:
 16625  16626  16627 -1104 -16628 0
 16625  16626  16627 -1104 -16629 0
 16625  16626  16627 -1104  16630 0

c  1+1 --> 2
c    (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0 ∧  p_1104) -> (-b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0)
c  in CNF:
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_2
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨  b^{46, 25}_1
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ -p_1104 ∨ -b^{46, 25}_0
c  in DIMACS:
 16625  16626 -16627 -1104 -16628 0
 16625  16626 -16627 -1104  16629 0
 16625  16626 -16627 -1104 -16630 0

c  2+1 --> break 
c    (-b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 16625 -16626  16627 -1104 1162 0


c  2-1 --> 1
c    (-b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧ -p_1104) -> (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0)
c  in CNF:
c     b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_2
c     b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_1
c     b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨  b^{46, 25}_0
c  in DIMACS:
 16625 -16626  16627  1104 -16628 0
 16625 -16626  16627  1104 -16629 0
 16625 -16626  16627  1104  16630 0

c  1-1 --> 0
c    (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0 ∧ -p_1104) -> (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧ -b^{46, 25}_0)
c  in CNF:
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_2
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_1
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_0
c  in DIMACS:
 16625  16626 -16627  1104 -16628 0
 16625  16626 -16627  1104 -16629 0
 16625  16626 -16627  1104 -16630 0

c  0-1 --> -1
c    (-b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧ -p_1104) -> ( b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0)
c  in CNF:
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨  b^{46, 25}_2
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_1
c     b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨  b^{46, 25}_0
c  in DIMACS:
 16625  16626  16627  1104  16628 0
 16625  16626  16627  1104 -16629 0
 16625  16626  16627  1104  16630 0

c  -1-1 --> -2
c    ( b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧  b^{46, 24}_0 ∧ -p_1104) -> ( b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0)
c  in CNF:
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨  b^{46, 25}_2
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨  b^{46, 25}_1
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨  p_1104 ∨ -b^{46, 25}_0
c  in DIMACS:
-16625  16626 -16627  1104  16628 0
-16625  16626 -16627  1104  16629 0
-16625  16626 -16627  1104 -16630 0

c  -2-1 --> break 
c    ( b^{46, 24}_2 ∧  b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨  b^{46, 24}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-16625 -16626  16627  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 24}_2 ∧ -b^{46, 24}_1 ∧ -b^{46, 24}_0 ∧ true) 
c  in CNF:
c    -b^{46, 24}_2 ∨  b^{46, 24}_1 ∨  b^{46, 24}_0 ∨ false 
c  in DIMACS:
-16625  16626  16627  0

c  3 does not represent an automaton state.
c    -(-b^{46, 24}_2 ∧  b^{46, 24}_1 ∧  b^{46, 24}_0 ∧ true) 
c  in CNF:
c     b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ false 
c  in DIMACS:
 16625 -16626 -16627  0
c  -3 does not represent an automaton state.
c    -( b^{46, 24}_2 ∧  b^{46, 24}_1 ∧  b^{46, 24}_0 ∧ true) 
c  in CNF:
c    -b^{46, 24}_2 ∨ -b^{46, 24}_1 ∨ -b^{46, 24}_0 ∨ false 
c  in DIMACS:
-16625 -16626 -16627  0

c i = 25
c  -2+1 --> -1
c    ( b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧  p_1150) -> ( b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧  b^{46, 26}_0)
c  in CNF:
c    -b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨  b^{46, 26}_2
c    -b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_1
c    -b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨  b^{46, 26}_0
c  in DIMACS:
-16628 -16629  16630 -1150  16631 0
-16628 -16629  16630 -1150 -16632 0
-16628 -16629  16630 -1150  16633 0

c  -1+1 --> 0
c    ( b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0 ∧  p_1150) -> (-b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧ -b^{46, 26}_0)
c  in CNF:
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_2
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_1
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_0
c  in DIMACS:
-16628  16629 -16630 -1150 -16631 0
-16628  16629 -16630 -1150 -16632 0
-16628  16629 -16630 -1150 -16633 0

c  0+1 --> 1
c    (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧  p_1150) -> (-b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧  b^{46, 26}_0)
c  in CNF:
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_2
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_1
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨  b^{46, 26}_0
c  in DIMACS:
 16628  16629  16630 -1150 -16631 0
 16628  16629  16630 -1150 -16632 0
 16628  16629  16630 -1150  16633 0

c  1+1 --> 2
c    (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0 ∧  p_1150) -> (-b^{46, 26}_2 ∧  b^{46, 26}_1 ∧ -b^{46, 26}_0)
c  in CNF:
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_2
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨  b^{46, 26}_1
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ -p_1150 ∨ -b^{46, 26}_0
c  in DIMACS:
 16628  16629 -16630 -1150 -16631 0
 16628  16629 -16630 -1150  16632 0
 16628  16629 -16630 -1150 -16633 0

c  2+1 --> break 
c    (-b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 16628 -16629  16630 -1150 1162 0


c  2-1 --> 1
c    (-b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧ -p_1150) -> (-b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧  b^{46, 26}_0)
c  in CNF:
c     b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_2
c     b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_1
c     b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨  b^{46, 26}_0
c  in DIMACS:
 16628 -16629  16630  1150 -16631 0
 16628 -16629  16630  1150 -16632 0
 16628 -16629  16630  1150  16633 0

c  1-1 --> 0
c    (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0 ∧ -p_1150) -> (-b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧ -b^{46, 26}_0)
c  in CNF:
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_2
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_1
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_0
c  in DIMACS:
 16628  16629 -16630  1150 -16631 0
 16628  16629 -16630  1150 -16632 0
 16628  16629 -16630  1150 -16633 0

c  0-1 --> -1
c    (-b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧ -p_1150) -> ( b^{46, 26}_2 ∧ -b^{46, 26}_1 ∧  b^{46, 26}_0)
c  in CNF:
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨  b^{46, 26}_2
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_1
c     b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨  b^{46, 26}_0
c  in DIMACS:
 16628  16629  16630  1150  16631 0
 16628  16629  16630  1150 -16632 0
 16628  16629  16630  1150  16633 0

c  -1-1 --> -2
c    ( b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧  b^{46, 25}_0 ∧ -p_1150) -> ( b^{46, 26}_2 ∧  b^{46, 26}_1 ∧ -b^{46, 26}_0)
c  in CNF:
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨  b^{46, 26}_2
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨  b^{46, 26}_1
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨  p_1150 ∨ -b^{46, 26}_0
c  in DIMACS:
-16628  16629 -16630  1150  16631 0
-16628  16629 -16630  1150  16632 0
-16628  16629 -16630  1150 -16633 0

c  -2-1 --> break 
c    ( b^{46, 25}_2 ∧  b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨  b^{46, 25}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-16628 -16629  16630  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{46, 25}_2 ∧ -b^{46, 25}_1 ∧ -b^{46, 25}_0 ∧ true) 
c  in CNF:
c    -b^{46, 25}_2 ∨  b^{46, 25}_1 ∨  b^{46, 25}_0 ∨ false 
c  in DIMACS:
-16628  16629  16630  0

c  3 does not represent an automaton state.
c    -(-b^{46, 25}_2 ∧  b^{46, 25}_1 ∧  b^{46, 25}_0 ∧ true) 
c  in CNF:
c     b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ false 
c  in DIMACS:
 16628 -16629 -16630  0
c  -3 does not represent an automaton state.
c    -( b^{46, 25}_2 ∧  b^{46, 25}_1 ∧  b^{46, 25}_0 ∧ true) 
c  in CNF:
c    -b^{46, 25}_2 ∨ -b^{46, 25}_1 ∨ -b^{46, 25}_0 ∨ false 
c  in DIMACS:
-16628 -16629 -16630  0

c INIT for k = 47
c    -b^{47, 1}_2
c    -b^{47, 1}_1
c    -b^{47, 1}_0
c  in DIMACS:
-16634 0
-16635 0
-16636 0

c Transitions for k = 47
c i = 1
c  -2+1 --> -1
c    ( b^{47, 1}_2 ∧  b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧  p_47) -> ( b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0)
c  in CNF:
c    -b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨  b^{47, 2}_2
c    -b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_1
c    -b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨  b^{47, 2}_0
c  in DIMACS:
-16634 -16635  16636 -47  16637 0
-16634 -16635  16636 -47 -16638 0
-16634 -16635  16636 -47  16639 0

c  -1+1 --> 0
c    ( b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧  b^{47, 1}_0 ∧  p_47) -> (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧ -b^{47, 2}_0)
c  in CNF:
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_2
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_1
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_0
c  in DIMACS:
-16634  16635 -16636 -47 -16637 0
-16634  16635 -16636 -47 -16638 0
-16634  16635 -16636 -47 -16639 0

c  0+1 --> 1
c    (-b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧  p_47) -> (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0)
c  in CNF:
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_2
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_1
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨  b^{47, 2}_0
c  in DIMACS:
 16634  16635  16636 -47 -16637 0
 16634  16635  16636 -47 -16638 0
 16634  16635  16636 -47  16639 0

c  1+1 --> 2
c    (-b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧  b^{47, 1}_0 ∧  p_47) -> (-b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0)
c  in CNF:
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_2
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨  b^{47, 2}_1
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ -p_47 ∨ -b^{47, 2}_0
c  in DIMACS:
 16634  16635 -16636 -47 -16637 0
 16634  16635 -16636 -47  16638 0
 16634  16635 -16636 -47 -16639 0

c  2+1 --> break 
c    (-b^{47, 1}_2 ∧  b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧  p_47) -> break
c  in CNF:
c     b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ -p_47 ∨ break
c  in DIMACS:
 16634 -16635  16636 -47 1162 0


c  2-1 --> 1
c    (-b^{47, 1}_2 ∧  b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧ -p_47) -> (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0)
c  in CNF:
c     b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_2
c     b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_1
c     b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨  b^{47, 2}_0
c  in DIMACS:
 16634 -16635  16636  47 -16637 0
 16634 -16635  16636  47 -16638 0
 16634 -16635  16636  47  16639 0

c  1-1 --> 0
c    (-b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧  b^{47, 1}_0 ∧ -p_47) -> (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧ -b^{47, 2}_0)
c  in CNF:
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_2
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_1
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_0
c  in DIMACS:
 16634  16635 -16636  47 -16637 0
 16634  16635 -16636  47 -16638 0
 16634  16635 -16636  47 -16639 0

c  0-1 --> -1
c    (-b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧ -p_47) -> ( b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0)
c  in CNF:
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨  b^{47, 2}_2
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_1
c     b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨  b^{47, 2}_0
c  in DIMACS:
 16634  16635  16636  47  16637 0
 16634  16635  16636  47 -16638 0
 16634  16635  16636  47  16639 0

c  -1-1 --> -2
c    ( b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧  b^{47, 1}_0 ∧ -p_47) -> ( b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0)
c  in CNF:
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨  b^{47, 2}_2
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨  b^{47, 2}_1
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨  p_47 ∨ -b^{47, 2}_0
c  in DIMACS:
-16634  16635 -16636  47  16637 0
-16634  16635 -16636  47  16638 0
-16634  16635 -16636  47 -16639 0

c  -2-1 --> break 
c    ( b^{47, 1}_2 ∧  b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧ -p_47) -> break
c  in CNF:
c    -b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨  b^{47, 1}_0 ∨  p_47 ∨ break
c  in DIMACS:
-16634 -16635  16636  47 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 1}_2 ∧ -b^{47, 1}_1 ∧ -b^{47, 1}_0 ∧ true) 
c  in CNF:
c    -b^{47, 1}_2 ∨  b^{47, 1}_1 ∨  b^{47, 1}_0 ∨ false 
c  in DIMACS:
-16634  16635  16636  0

c  3 does not represent an automaton state.
c    -(-b^{47, 1}_2 ∧  b^{47, 1}_1 ∧  b^{47, 1}_0 ∧ true) 
c  in CNF:
c     b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ false 
c  in DIMACS:
 16634 -16635 -16636  0
c  -3 does not represent an automaton state.
c    -( b^{47, 1}_2 ∧  b^{47, 1}_1 ∧  b^{47, 1}_0 ∧ true) 
c  in CNF:
c    -b^{47, 1}_2 ∨ -b^{47, 1}_1 ∨ -b^{47, 1}_0 ∨ false 
c  in DIMACS:
-16634 -16635 -16636  0

c i = 2
c  -2+1 --> -1
c    ( b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧  p_94) -> ( b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0)
c  in CNF:
c    -b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨  b^{47, 3}_2
c    -b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_1
c    -b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨  b^{47, 3}_0
c  in DIMACS:
-16637 -16638  16639 -94  16640 0
-16637 -16638  16639 -94 -16641 0
-16637 -16638  16639 -94  16642 0

c  -1+1 --> 0
c    ( b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0 ∧  p_94) -> (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧ -b^{47, 3}_0)
c  in CNF:
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_2
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_1
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_0
c  in DIMACS:
-16637  16638 -16639 -94 -16640 0
-16637  16638 -16639 -94 -16641 0
-16637  16638 -16639 -94 -16642 0

c  0+1 --> 1
c    (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧  p_94) -> (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0)
c  in CNF:
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_2
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_1
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨  b^{47, 3}_0
c  in DIMACS:
 16637  16638  16639 -94 -16640 0
 16637  16638  16639 -94 -16641 0
 16637  16638  16639 -94  16642 0

c  1+1 --> 2
c    (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0 ∧  p_94) -> (-b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0)
c  in CNF:
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_2
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨  b^{47, 3}_1
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ -p_94 ∨ -b^{47, 3}_0
c  in DIMACS:
 16637  16638 -16639 -94 -16640 0
 16637  16638 -16639 -94  16641 0
 16637  16638 -16639 -94 -16642 0

c  2+1 --> break 
c    (-b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧  p_94) -> break
c  in CNF:
c     b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ -p_94 ∨ break
c  in DIMACS:
 16637 -16638  16639 -94 1162 0


c  2-1 --> 1
c    (-b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧ -p_94) -> (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0)
c  in CNF:
c     b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_2
c     b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_1
c     b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨  b^{47, 3}_0
c  in DIMACS:
 16637 -16638  16639  94 -16640 0
 16637 -16638  16639  94 -16641 0
 16637 -16638  16639  94  16642 0

c  1-1 --> 0
c    (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0 ∧ -p_94) -> (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧ -b^{47, 3}_0)
c  in CNF:
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_2
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_1
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_0
c  in DIMACS:
 16637  16638 -16639  94 -16640 0
 16637  16638 -16639  94 -16641 0
 16637  16638 -16639  94 -16642 0

c  0-1 --> -1
c    (-b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧ -p_94) -> ( b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0)
c  in CNF:
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨  b^{47, 3}_2
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_1
c     b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨  b^{47, 3}_0
c  in DIMACS:
 16637  16638  16639  94  16640 0
 16637  16638  16639  94 -16641 0
 16637  16638  16639  94  16642 0

c  -1-1 --> -2
c    ( b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧  b^{47, 2}_0 ∧ -p_94) -> ( b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0)
c  in CNF:
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨  b^{47, 3}_2
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨  b^{47, 3}_1
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨  p_94 ∨ -b^{47, 3}_0
c  in DIMACS:
-16637  16638 -16639  94  16640 0
-16637  16638 -16639  94  16641 0
-16637  16638 -16639  94 -16642 0

c  -2-1 --> break 
c    ( b^{47, 2}_2 ∧  b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧ -p_94) -> break
c  in CNF:
c    -b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨  b^{47, 2}_0 ∨  p_94 ∨ break
c  in DIMACS:
-16637 -16638  16639  94 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 2}_2 ∧ -b^{47, 2}_1 ∧ -b^{47, 2}_0 ∧ true) 
c  in CNF:
c    -b^{47, 2}_2 ∨  b^{47, 2}_1 ∨  b^{47, 2}_0 ∨ false 
c  in DIMACS:
-16637  16638  16639  0

c  3 does not represent an automaton state.
c    -(-b^{47, 2}_2 ∧  b^{47, 2}_1 ∧  b^{47, 2}_0 ∧ true) 
c  in CNF:
c     b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ false 
c  in DIMACS:
 16637 -16638 -16639  0
c  -3 does not represent an automaton state.
c    -( b^{47, 2}_2 ∧  b^{47, 2}_1 ∧  b^{47, 2}_0 ∧ true) 
c  in CNF:
c    -b^{47, 2}_2 ∨ -b^{47, 2}_1 ∨ -b^{47, 2}_0 ∨ false 
c  in DIMACS:
-16637 -16638 -16639  0

c i = 3
c  -2+1 --> -1
c    ( b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧  p_141) -> ( b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0)
c  in CNF:
c    -b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨  b^{47, 4}_2
c    -b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_1
c    -b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨  b^{47, 4}_0
c  in DIMACS:
-16640 -16641  16642 -141  16643 0
-16640 -16641  16642 -141 -16644 0
-16640 -16641  16642 -141  16645 0

c  -1+1 --> 0
c    ( b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0 ∧  p_141) -> (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧ -b^{47, 4}_0)
c  in CNF:
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_2
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_1
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_0
c  in DIMACS:
-16640  16641 -16642 -141 -16643 0
-16640  16641 -16642 -141 -16644 0
-16640  16641 -16642 -141 -16645 0

c  0+1 --> 1
c    (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧  p_141) -> (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0)
c  in CNF:
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_2
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_1
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨  b^{47, 4}_0
c  in DIMACS:
 16640  16641  16642 -141 -16643 0
 16640  16641  16642 -141 -16644 0
 16640  16641  16642 -141  16645 0

c  1+1 --> 2
c    (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0 ∧  p_141) -> (-b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0)
c  in CNF:
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_2
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨  b^{47, 4}_1
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ -p_141 ∨ -b^{47, 4}_0
c  in DIMACS:
 16640  16641 -16642 -141 -16643 0
 16640  16641 -16642 -141  16644 0
 16640  16641 -16642 -141 -16645 0

c  2+1 --> break 
c    (-b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧  p_141) -> break
c  in CNF:
c     b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ -p_141 ∨ break
c  in DIMACS:
 16640 -16641  16642 -141 1162 0


c  2-1 --> 1
c    (-b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧ -p_141) -> (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0)
c  in CNF:
c     b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_2
c     b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_1
c     b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨  b^{47, 4}_0
c  in DIMACS:
 16640 -16641  16642  141 -16643 0
 16640 -16641  16642  141 -16644 0
 16640 -16641  16642  141  16645 0

c  1-1 --> 0
c    (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0 ∧ -p_141) -> (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧ -b^{47, 4}_0)
c  in CNF:
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_2
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_1
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_0
c  in DIMACS:
 16640  16641 -16642  141 -16643 0
 16640  16641 -16642  141 -16644 0
 16640  16641 -16642  141 -16645 0

c  0-1 --> -1
c    (-b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧ -p_141) -> ( b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0)
c  in CNF:
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨  b^{47, 4}_2
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_1
c     b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨  b^{47, 4}_0
c  in DIMACS:
 16640  16641  16642  141  16643 0
 16640  16641  16642  141 -16644 0
 16640  16641  16642  141  16645 0

c  -1-1 --> -2
c    ( b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧  b^{47, 3}_0 ∧ -p_141) -> ( b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0)
c  in CNF:
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨  b^{47, 4}_2
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨  b^{47, 4}_1
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨  p_141 ∨ -b^{47, 4}_0
c  in DIMACS:
-16640  16641 -16642  141  16643 0
-16640  16641 -16642  141  16644 0
-16640  16641 -16642  141 -16645 0

c  -2-1 --> break 
c    ( b^{47, 3}_2 ∧  b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧ -p_141) -> break
c  in CNF:
c    -b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨  b^{47, 3}_0 ∨  p_141 ∨ break
c  in DIMACS:
-16640 -16641  16642  141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 3}_2 ∧ -b^{47, 3}_1 ∧ -b^{47, 3}_0 ∧ true) 
c  in CNF:
c    -b^{47, 3}_2 ∨  b^{47, 3}_1 ∨  b^{47, 3}_0 ∨ false 
c  in DIMACS:
-16640  16641  16642  0

c  3 does not represent an automaton state.
c    -(-b^{47, 3}_2 ∧  b^{47, 3}_1 ∧  b^{47, 3}_0 ∧ true) 
c  in CNF:
c     b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ false 
c  in DIMACS:
 16640 -16641 -16642  0
c  -3 does not represent an automaton state.
c    -( b^{47, 3}_2 ∧  b^{47, 3}_1 ∧  b^{47, 3}_0 ∧ true) 
c  in CNF:
c    -b^{47, 3}_2 ∨ -b^{47, 3}_1 ∨ -b^{47, 3}_0 ∨ false 
c  in DIMACS:
-16640 -16641 -16642  0

c i = 4
c  -2+1 --> -1
c    ( b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧  p_188) -> ( b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0)
c  in CNF:
c    -b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨  b^{47, 5}_2
c    -b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_1
c    -b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨  b^{47, 5}_0
c  in DIMACS:
-16643 -16644  16645 -188  16646 0
-16643 -16644  16645 -188 -16647 0
-16643 -16644  16645 -188  16648 0

c  -1+1 --> 0
c    ( b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0 ∧  p_188) -> (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧ -b^{47, 5}_0)
c  in CNF:
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_2
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_1
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_0
c  in DIMACS:
-16643  16644 -16645 -188 -16646 0
-16643  16644 -16645 -188 -16647 0
-16643  16644 -16645 -188 -16648 0

c  0+1 --> 1
c    (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧  p_188) -> (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0)
c  in CNF:
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_2
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_1
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨  b^{47, 5}_0
c  in DIMACS:
 16643  16644  16645 -188 -16646 0
 16643  16644  16645 -188 -16647 0
 16643  16644  16645 -188  16648 0

c  1+1 --> 2
c    (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0 ∧  p_188) -> (-b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0)
c  in CNF:
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_2
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨  b^{47, 5}_1
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ -p_188 ∨ -b^{47, 5}_0
c  in DIMACS:
 16643  16644 -16645 -188 -16646 0
 16643  16644 -16645 -188  16647 0
 16643  16644 -16645 -188 -16648 0

c  2+1 --> break 
c    (-b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧  p_188) -> break
c  in CNF:
c     b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 16643 -16644  16645 -188 1162 0


c  2-1 --> 1
c    (-b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧ -p_188) -> (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0)
c  in CNF:
c     b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_2
c     b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_1
c     b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨  b^{47, 5}_0
c  in DIMACS:
 16643 -16644  16645  188 -16646 0
 16643 -16644  16645  188 -16647 0
 16643 -16644  16645  188  16648 0

c  1-1 --> 0
c    (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0 ∧ -p_188) -> (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧ -b^{47, 5}_0)
c  in CNF:
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_2
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_1
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_0
c  in DIMACS:
 16643  16644 -16645  188 -16646 0
 16643  16644 -16645  188 -16647 0
 16643  16644 -16645  188 -16648 0

c  0-1 --> -1
c    (-b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧ -p_188) -> ( b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0)
c  in CNF:
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨  b^{47, 5}_2
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_1
c     b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨  b^{47, 5}_0
c  in DIMACS:
 16643  16644  16645  188  16646 0
 16643  16644  16645  188 -16647 0
 16643  16644  16645  188  16648 0

c  -1-1 --> -2
c    ( b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧  b^{47, 4}_0 ∧ -p_188) -> ( b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0)
c  in CNF:
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨  b^{47, 5}_2
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨  b^{47, 5}_1
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨  p_188 ∨ -b^{47, 5}_0
c  in DIMACS:
-16643  16644 -16645  188  16646 0
-16643  16644 -16645  188  16647 0
-16643  16644 -16645  188 -16648 0

c  -2-1 --> break 
c    ( b^{47, 4}_2 ∧  b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨  b^{47, 4}_0 ∨  p_188 ∨ break
c  in DIMACS:
-16643 -16644  16645  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 4}_2 ∧ -b^{47, 4}_1 ∧ -b^{47, 4}_0 ∧ true) 
c  in CNF:
c    -b^{47, 4}_2 ∨  b^{47, 4}_1 ∨  b^{47, 4}_0 ∨ false 
c  in DIMACS:
-16643  16644  16645  0

c  3 does not represent an automaton state.
c    -(-b^{47, 4}_2 ∧  b^{47, 4}_1 ∧  b^{47, 4}_0 ∧ true) 
c  in CNF:
c     b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ false 
c  in DIMACS:
 16643 -16644 -16645  0
c  -3 does not represent an automaton state.
c    -( b^{47, 4}_2 ∧  b^{47, 4}_1 ∧  b^{47, 4}_0 ∧ true) 
c  in CNF:
c    -b^{47, 4}_2 ∨ -b^{47, 4}_1 ∨ -b^{47, 4}_0 ∨ false 
c  in DIMACS:
-16643 -16644 -16645  0

c i = 5
c  -2+1 --> -1
c    ( b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧  p_235) -> ( b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0)
c  in CNF:
c    -b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨  b^{47, 6}_2
c    -b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_1
c    -b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨  b^{47, 6}_0
c  in DIMACS:
-16646 -16647  16648 -235  16649 0
-16646 -16647  16648 -235 -16650 0
-16646 -16647  16648 -235  16651 0

c  -1+1 --> 0
c    ( b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0 ∧  p_235) -> (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧ -b^{47, 6}_0)
c  in CNF:
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_2
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_1
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_0
c  in DIMACS:
-16646  16647 -16648 -235 -16649 0
-16646  16647 -16648 -235 -16650 0
-16646  16647 -16648 -235 -16651 0

c  0+1 --> 1
c    (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧  p_235) -> (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0)
c  in CNF:
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_2
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_1
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨  b^{47, 6}_0
c  in DIMACS:
 16646  16647  16648 -235 -16649 0
 16646  16647  16648 -235 -16650 0
 16646  16647  16648 -235  16651 0

c  1+1 --> 2
c    (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0 ∧  p_235) -> (-b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0)
c  in CNF:
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_2
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨  b^{47, 6}_1
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ -p_235 ∨ -b^{47, 6}_0
c  in DIMACS:
 16646  16647 -16648 -235 -16649 0
 16646  16647 -16648 -235  16650 0
 16646  16647 -16648 -235 -16651 0

c  2+1 --> break 
c    (-b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧  p_235) -> break
c  in CNF:
c     b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ -p_235 ∨ break
c  in DIMACS:
 16646 -16647  16648 -235 1162 0


c  2-1 --> 1
c    (-b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧ -p_235) -> (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0)
c  in CNF:
c     b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_2
c     b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_1
c     b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨  b^{47, 6}_0
c  in DIMACS:
 16646 -16647  16648  235 -16649 0
 16646 -16647  16648  235 -16650 0
 16646 -16647  16648  235  16651 0

c  1-1 --> 0
c    (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0 ∧ -p_235) -> (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧ -b^{47, 6}_0)
c  in CNF:
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_2
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_1
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_0
c  in DIMACS:
 16646  16647 -16648  235 -16649 0
 16646  16647 -16648  235 -16650 0
 16646  16647 -16648  235 -16651 0

c  0-1 --> -1
c    (-b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧ -p_235) -> ( b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0)
c  in CNF:
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨  b^{47, 6}_2
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_1
c     b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨  b^{47, 6}_0
c  in DIMACS:
 16646  16647  16648  235  16649 0
 16646  16647  16648  235 -16650 0
 16646  16647  16648  235  16651 0

c  -1-1 --> -2
c    ( b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧  b^{47, 5}_0 ∧ -p_235) -> ( b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0)
c  in CNF:
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨  b^{47, 6}_2
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨  b^{47, 6}_1
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨  p_235 ∨ -b^{47, 6}_0
c  in DIMACS:
-16646  16647 -16648  235  16649 0
-16646  16647 -16648  235  16650 0
-16646  16647 -16648  235 -16651 0

c  -2-1 --> break 
c    ( b^{47, 5}_2 ∧  b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧ -p_235) -> break
c  in CNF:
c    -b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨  b^{47, 5}_0 ∨  p_235 ∨ break
c  in DIMACS:
-16646 -16647  16648  235 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 5}_2 ∧ -b^{47, 5}_1 ∧ -b^{47, 5}_0 ∧ true) 
c  in CNF:
c    -b^{47, 5}_2 ∨  b^{47, 5}_1 ∨  b^{47, 5}_0 ∨ false 
c  in DIMACS:
-16646  16647  16648  0

c  3 does not represent an automaton state.
c    -(-b^{47, 5}_2 ∧  b^{47, 5}_1 ∧  b^{47, 5}_0 ∧ true) 
c  in CNF:
c     b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ false 
c  in DIMACS:
 16646 -16647 -16648  0
c  -3 does not represent an automaton state.
c    -( b^{47, 5}_2 ∧  b^{47, 5}_1 ∧  b^{47, 5}_0 ∧ true) 
c  in CNF:
c    -b^{47, 5}_2 ∨ -b^{47, 5}_1 ∨ -b^{47, 5}_0 ∨ false 
c  in DIMACS:
-16646 -16647 -16648  0

c i = 6
c  -2+1 --> -1
c    ( b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧  p_282) -> ( b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0)
c  in CNF:
c    -b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨  b^{47, 7}_2
c    -b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_1
c    -b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨  b^{47, 7}_0
c  in DIMACS:
-16649 -16650  16651 -282  16652 0
-16649 -16650  16651 -282 -16653 0
-16649 -16650  16651 -282  16654 0

c  -1+1 --> 0
c    ( b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0 ∧  p_282) -> (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧ -b^{47, 7}_0)
c  in CNF:
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_2
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_1
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_0
c  in DIMACS:
-16649  16650 -16651 -282 -16652 0
-16649  16650 -16651 -282 -16653 0
-16649  16650 -16651 -282 -16654 0

c  0+1 --> 1
c    (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧  p_282) -> (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0)
c  in CNF:
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_2
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_1
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨  b^{47, 7}_0
c  in DIMACS:
 16649  16650  16651 -282 -16652 0
 16649  16650  16651 -282 -16653 0
 16649  16650  16651 -282  16654 0

c  1+1 --> 2
c    (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0 ∧  p_282) -> (-b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0)
c  in CNF:
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_2
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨  b^{47, 7}_1
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ -p_282 ∨ -b^{47, 7}_0
c  in DIMACS:
 16649  16650 -16651 -282 -16652 0
 16649  16650 -16651 -282  16653 0
 16649  16650 -16651 -282 -16654 0

c  2+1 --> break 
c    (-b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧  p_282) -> break
c  in CNF:
c     b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 16649 -16650  16651 -282 1162 0


c  2-1 --> 1
c    (-b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧ -p_282) -> (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0)
c  in CNF:
c     b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_2
c     b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_1
c     b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨  b^{47, 7}_0
c  in DIMACS:
 16649 -16650  16651  282 -16652 0
 16649 -16650  16651  282 -16653 0
 16649 -16650  16651  282  16654 0

c  1-1 --> 0
c    (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0 ∧ -p_282) -> (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧ -b^{47, 7}_0)
c  in CNF:
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_2
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_1
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_0
c  in DIMACS:
 16649  16650 -16651  282 -16652 0
 16649  16650 -16651  282 -16653 0
 16649  16650 -16651  282 -16654 0

c  0-1 --> -1
c    (-b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧ -p_282) -> ( b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0)
c  in CNF:
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨  b^{47, 7}_2
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_1
c     b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨  b^{47, 7}_0
c  in DIMACS:
 16649  16650  16651  282  16652 0
 16649  16650  16651  282 -16653 0
 16649  16650  16651  282  16654 0

c  -1-1 --> -2
c    ( b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧  b^{47, 6}_0 ∧ -p_282) -> ( b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0)
c  in CNF:
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨  b^{47, 7}_2
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨  b^{47, 7}_1
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨  p_282 ∨ -b^{47, 7}_0
c  in DIMACS:
-16649  16650 -16651  282  16652 0
-16649  16650 -16651  282  16653 0
-16649  16650 -16651  282 -16654 0

c  -2-1 --> break 
c    ( b^{47, 6}_2 ∧  b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨  b^{47, 6}_0 ∨  p_282 ∨ break
c  in DIMACS:
-16649 -16650  16651  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 6}_2 ∧ -b^{47, 6}_1 ∧ -b^{47, 6}_0 ∧ true) 
c  in CNF:
c    -b^{47, 6}_2 ∨  b^{47, 6}_1 ∨  b^{47, 6}_0 ∨ false 
c  in DIMACS:
-16649  16650  16651  0

c  3 does not represent an automaton state.
c    -(-b^{47, 6}_2 ∧  b^{47, 6}_1 ∧  b^{47, 6}_0 ∧ true) 
c  in CNF:
c     b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ false 
c  in DIMACS:
 16649 -16650 -16651  0
c  -3 does not represent an automaton state.
c    -( b^{47, 6}_2 ∧  b^{47, 6}_1 ∧  b^{47, 6}_0 ∧ true) 
c  in CNF:
c    -b^{47, 6}_2 ∨ -b^{47, 6}_1 ∨ -b^{47, 6}_0 ∨ false 
c  in DIMACS:
-16649 -16650 -16651  0

c i = 7
c  -2+1 --> -1
c    ( b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧  p_329) -> ( b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0)
c  in CNF:
c    -b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨  b^{47, 8}_2
c    -b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_1
c    -b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨  b^{47, 8}_0
c  in DIMACS:
-16652 -16653  16654 -329  16655 0
-16652 -16653  16654 -329 -16656 0
-16652 -16653  16654 -329  16657 0

c  -1+1 --> 0
c    ( b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0 ∧  p_329) -> (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧ -b^{47, 8}_0)
c  in CNF:
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_2
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_1
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_0
c  in DIMACS:
-16652  16653 -16654 -329 -16655 0
-16652  16653 -16654 -329 -16656 0
-16652  16653 -16654 -329 -16657 0

c  0+1 --> 1
c    (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧  p_329) -> (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0)
c  in CNF:
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_2
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_1
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨  b^{47, 8}_0
c  in DIMACS:
 16652  16653  16654 -329 -16655 0
 16652  16653  16654 -329 -16656 0
 16652  16653  16654 -329  16657 0

c  1+1 --> 2
c    (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0 ∧  p_329) -> (-b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0)
c  in CNF:
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_2
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨  b^{47, 8}_1
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ -p_329 ∨ -b^{47, 8}_0
c  in DIMACS:
 16652  16653 -16654 -329 -16655 0
 16652  16653 -16654 -329  16656 0
 16652  16653 -16654 -329 -16657 0

c  2+1 --> break 
c    (-b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧  p_329) -> break
c  in CNF:
c     b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ -p_329 ∨ break
c  in DIMACS:
 16652 -16653  16654 -329 1162 0


c  2-1 --> 1
c    (-b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧ -p_329) -> (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0)
c  in CNF:
c     b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_2
c     b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_1
c     b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨  b^{47, 8}_0
c  in DIMACS:
 16652 -16653  16654  329 -16655 0
 16652 -16653  16654  329 -16656 0
 16652 -16653  16654  329  16657 0

c  1-1 --> 0
c    (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0 ∧ -p_329) -> (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧ -b^{47, 8}_0)
c  in CNF:
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_2
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_1
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_0
c  in DIMACS:
 16652  16653 -16654  329 -16655 0
 16652  16653 -16654  329 -16656 0
 16652  16653 -16654  329 -16657 0

c  0-1 --> -1
c    (-b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧ -p_329) -> ( b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0)
c  in CNF:
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨  b^{47, 8}_2
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_1
c     b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨  b^{47, 8}_0
c  in DIMACS:
 16652  16653  16654  329  16655 0
 16652  16653  16654  329 -16656 0
 16652  16653  16654  329  16657 0

c  -1-1 --> -2
c    ( b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧  b^{47, 7}_0 ∧ -p_329) -> ( b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0)
c  in CNF:
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨  b^{47, 8}_2
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨  b^{47, 8}_1
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨  p_329 ∨ -b^{47, 8}_0
c  in DIMACS:
-16652  16653 -16654  329  16655 0
-16652  16653 -16654  329  16656 0
-16652  16653 -16654  329 -16657 0

c  -2-1 --> break 
c    ( b^{47, 7}_2 ∧  b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧ -p_329) -> break
c  in CNF:
c    -b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨  b^{47, 7}_0 ∨  p_329 ∨ break
c  in DIMACS:
-16652 -16653  16654  329 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 7}_2 ∧ -b^{47, 7}_1 ∧ -b^{47, 7}_0 ∧ true) 
c  in CNF:
c    -b^{47, 7}_2 ∨  b^{47, 7}_1 ∨  b^{47, 7}_0 ∨ false 
c  in DIMACS:
-16652  16653  16654  0

c  3 does not represent an automaton state.
c    -(-b^{47, 7}_2 ∧  b^{47, 7}_1 ∧  b^{47, 7}_0 ∧ true) 
c  in CNF:
c     b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ false 
c  in DIMACS:
 16652 -16653 -16654  0
c  -3 does not represent an automaton state.
c    -( b^{47, 7}_2 ∧  b^{47, 7}_1 ∧  b^{47, 7}_0 ∧ true) 
c  in CNF:
c    -b^{47, 7}_2 ∨ -b^{47, 7}_1 ∨ -b^{47, 7}_0 ∨ false 
c  in DIMACS:
-16652 -16653 -16654  0

c i = 8
c  -2+1 --> -1
c    ( b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧  p_376) -> ( b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0)
c  in CNF:
c    -b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨  b^{47, 9}_2
c    -b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_1
c    -b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨  b^{47, 9}_0
c  in DIMACS:
-16655 -16656  16657 -376  16658 0
-16655 -16656  16657 -376 -16659 0
-16655 -16656  16657 -376  16660 0

c  -1+1 --> 0
c    ( b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0 ∧  p_376) -> (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧ -b^{47, 9}_0)
c  in CNF:
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_2
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_1
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_0
c  in DIMACS:
-16655  16656 -16657 -376 -16658 0
-16655  16656 -16657 -376 -16659 0
-16655  16656 -16657 -376 -16660 0

c  0+1 --> 1
c    (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧  p_376) -> (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0)
c  in CNF:
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_2
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_1
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨  b^{47, 9}_0
c  in DIMACS:
 16655  16656  16657 -376 -16658 0
 16655  16656  16657 -376 -16659 0
 16655  16656  16657 -376  16660 0

c  1+1 --> 2
c    (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0 ∧  p_376) -> (-b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0)
c  in CNF:
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_2
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨  b^{47, 9}_1
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ -p_376 ∨ -b^{47, 9}_0
c  in DIMACS:
 16655  16656 -16657 -376 -16658 0
 16655  16656 -16657 -376  16659 0
 16655  16656 -16657 -376 -16660 0

c  2+1 --> break 
c    (-b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧  p_376) -> break
c  in CNF:
c     b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 16655 -16656  16657 -376 1162 0


c  2-1 --> 1
c    (-b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧ -p_376) -> (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0)
c  in CNF:
c     b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_2
c     b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_1
c     b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨  b^{47, 9}_0
c  in DIMACS:
 16655 -16656  16657  376 -16658 0
 16655 -16656  16657  376 -16659 0
 16655 -16656  16657  376  16660 0

c  1-1 --> 0
c    (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0 ∧ -p_376) -> (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧ -b^{47, 9}_0)
c  in CNF:
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_2
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_1
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_0
c  in DIMACS:
 16655  16656 -16657  376 -16658 0
 16655  16656 -16657  376 -16659 0
 16655  16656 -16657  376 -16660 0

c  0-1 --> -1
c    (-b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧ -p_376) -> ( b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0)
c  in CNF:
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨  b^{47, 9}_2
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_1
c     b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨  b^{47, 9}_0
c  in DIMACS:
 16655  16656  16657  376  16658 0
 16655  16656  16657  376 -16659 0
 16655  16656  16657  376  16660 0

c  -1-1 --> -2
c    ( b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧  b^{47, 8}_0 ∧ -p_376) -> ( b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0)
c  in CNF:
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨  b^{47, 9}_2
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨  b^{47, 9}_1
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨  p_376 ∨ -b^{47, 9}_0
c  in DIMACS:
-16655  16656 -16657  376  16658 0
-16655  16656 -16657  376  16659 0
-16655  16656 -16657  376 -16660 0

c  -2-1 --> break 
c    ( b^{47, 8}_2 ∧  b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨  b^{47, 8}_0 ∨  p_376 ∨ break
c  in DIMACS:
-16655 -16656  16657  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 8}_2 ∧ -b^{47, 8}_1 ∧ -b^{47, 8}_0 ∧ true) 
c  in CNF:
c    -b^{47, 8}_2 ∨  b^{47, 8}_1 ∨  b^{47, 8}_0 ∨ false 
c  in DIMACS:
-16655  16656  16657  0

c  3 does not represent an automaton state.
c    -(-b^{47, 8}_2 ∧  b^{47, 8}_1 ∧  b^{47, 8}_0 ∧ true) 
c  in CNF:
c     b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ false 
c  in DIMACS:
 16655 -16656 -16657  0
c  -3 does not represent an automaton state.
c    -( b^{47, 8}_2 ∧  b^{47, 8}_1 ∧  b^{47, 8}_0 ∧ true) 
c  in CNF:
c    -b^{47, 8}_2 ∨ -b^{47, 8}_1 ∨ -b^{47, 8}_0 ∨ false 
c  in DIMACS:
-16655 -16656 -16657  0

c i = 9
c  -2+1 --> -1
c    ( b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧  p_423) -> ( b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0)
c  in CNF:
c    -b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨  b^{47, 10}_2
c    -b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_1
c    -b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨  b^{47, 10}_0
c  in DIMACS:
-16658 -16659  16660 -423  16661 0
-16658 -16659  16660 -423 -16662 0
-16658 -16659  16660 -423  16663 0

c  -1+1 --> 0
c    ( b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0 ∧  p_423) -> (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧ -b^{47, 10}_0)
c  in CNF:
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_2
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_1
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_0
c  in DIMACS:
-16658  16659 -16660 -423 -16661 0
-16658  16659 -16660 -423 -16662 0
-16658  16659 -16660 -423 -16663 0

c  0+1 --> 1
c    (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧  p_423) -> (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0)
c  in CNF:
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_2
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_1
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨  b^{47, 10}_0
c  in DIMACS:
 16658  16659  16660 -423 -16661 0
 16658  16659  16660 -423 -16662 0
 16658  16659  16660 -423  16663 0

c  1+1 --> 2
c    (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0 ∧  p_423) -> (-b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0)
c  in CNF:
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_2
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨  b^{47, 10}_1
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ -p_423 ∨ -b^{47, 10}_0
c  in DIMACS:
 16658  16659 -16660 -423 -16661 0
 16658  16659 -16660 -423  16662 0
 16658  16659 -16660 -423 -16663 0

c  2+1 --> break 
c    (-b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧  p_423) -> break
c  in CNF:
c     b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ -p_423 ∨ break
c  in DIMACS:
 16658 -16659  16660 -423 1162 0


c  2-1 --> 1
c    (-b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧ -p_423) -> (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0)
c  in CNF:
c     b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_2
c     b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_1
c     b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨  b^{47, 10}_0
c  in DIMACS:
 16658 -16659  16660  423 -16661 0
 16658 -16659  16660  423 -16662 0
 16658 -16659  16660  423  16663 0

c  1-1 --> 0
c    (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0 ∧ -p_423) -> (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧ -b^{47, 10}_0)
c  in CNF:
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_2
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_1
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_0
c  in DIMACS:
 16658  16659 -16660  423 -16661 0
 16658  16659 -16660  423 -16662 0
 16658  16659 -16660  423 -16663 0

c  0-1 --> -1
c    (-b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧ -p_423) -> ( b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0)
c  in CNF:
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨  b^{47, 10}_2
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_1
c     b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨  b^{47, 10}_0
c  in DIMACS:
 16658  16659  16660  423  16661 0
 16658  16659  16660  423 -16662 0
 16658  16659  16660  423  16663 0

c  -1-1 --> -2
c    ( b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧  b^{47, 9}_0 ∧ -p_423) -> ( b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0)
c  in CNF:
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨  b^{47, 10}_2
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨  b^{47, 10}_1
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨  p_423 ∨ -b^{47, 10}_0
c  in DIMACS:
-16658  16659 -16660  423  16661 0
-16658  16659 -16660  423  16662 0
-16658  16659 -16660  423 -16663 0

c  -2-1 --> break 
c    ( b^{47, 9}_2 ∧  b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧ -p_423) -> break
c  in CNF:
c    -b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨  b^{47, 9}_0 ∨  p_423 ∨ break
c  in DIMACS:
-16658 -16659  16660  423 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 9}_2 ∧ -b^{47, 9}_1 ∧ -b^{47, 9}_0 ∧ true) 
c  in CNF:
c    -b^{47, 9}_2 ∨  b^{47, 9}_1 ∨  b^{47, 9}_0 ∨ false 
c  in DIMACS:
-16658  16659  16660  0

c  3 does not represent an automaton state.
c    -(-b^{47, 9}_2 ∧  b^{47, 9}_1 ∧  b^{47, 9}_0 ∧ true) 
c  in CNF:
c     b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ false 
c  in DIMACS:
 16658 -16659 -16660  0
c  -3 does not represent an automaton state.
c    -( b^{47, 9}_2 ∧  b^{47, 9}_1 ∧  b^{47, 9}_0 ∧ true) 
c  in CNF:
c    -b^{47, 9}_2 ∨ -b^{47, 9}_1 ∨ -b^{47, 9}_0 ∨ false 
c  in DIMACS:
-16658 -16659 -16660  0

c i = 10
c  -2+1 --> -1
c    ( b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧  p_470) -> ( b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0)
c  in CNF:
c    -b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨  b^{47, 11}_2
c    -b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_1
c    -b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨  b^{47, 11}_0
c  in DIMACS:
-16661 -16662  16663 -470  16664 0
-16661 -16662  16663 -470 -16665 0
-16661 -16662  16663 -470  16666 0

c  -1+1 --> 0
c    ( b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0 ∧  p_470) -> (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧ -b^{47, 11}_0)
c  in CNF:
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_2
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_1
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_0
c  in DIMACS:
-16661  16662 -16663 -470 -16664 0
-16661  16662 -16663 -470 -16665 0
-16661  16662 -16663 -470 -16666 0

c  0+1 --> 1
c    (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧  p_470) -> (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0)
c  in CNF:
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_2
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_1
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨  b^{47, 11}_0
c  in DIMACS:
 16661  16662  16663 -470 -16664 0
 16661  16662  16663 -470 -16665 0
 16661  16662  16663 -470  16666 0

c  1+1 --> 2
c    (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0 ∧  p_470) -> (-b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0)
c  in CNF:
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_2
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨  b^{47, 11}_1
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ -p_470 ∨ -b^{47, 11}_0
c  in DIMACS:
 16661  16662 -16663 -470 -16664 0
 16661  16662 -16663 -470  16665 0
 16661  16662 -16663 -470 -16666 0

c  2+1 --> break 
c    (-b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧  p_470) -> break
c  in CNF:
c     b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 16661 -16662  16663 -470 1162 0


c  2-1 --> 1
c    (-b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧ -p_470) -> (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0)
c  in CNF:
c     b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_2
c     b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_1
c     b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨  b^{47, 11}_0
c  in DIMACS:
 16661 -16662  16663  470 -16664 0
 16661 -16662  16663  470 -16665 0
 16661 -16662  16663  470  16666 0

c  1-1 --> 0
c    (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0 ∧ -p_470) -> (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧ -b^{47, 11}_0)
c  in CNF:
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_2
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_1
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_0
c  in DIMACS:
 16661  16662 -16663  470 -16664 0
 16661  16662 -16663  470 -16665 0
 16661  16662 -16663  470 -16666 0

c  0-1 --> -1
c    (-b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧ -p_470) -> ( b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0)
c  in CNF:
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨  b^{47, 11}_2
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_1
c     b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨  b^{47, 11}_0
c  in DIMACS:
 16661  16662  16663  470  16664 0
 16661  16662  16663  470 -16665 0
 16661  16662  16663  470  16666 0

c  -1-1 --> -2
c    ( b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧  b^{47, 10}_0 ∧ -p_470) -> ( b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0)
c  in CNF:
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨  b^{47, 11}_2
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨  b^{47, 11}_1
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨  p_470 ∨ -b^{47, 11}_0
c  in DIMACS:
-16661  16662 -16663  470  16664 0
-16661  16662 -16663  470  16665 0
-16661  16662 -16663  470 -16666 0

c  -2-1 --> break 
c    ( b^{47, 10}_2 ∧  b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨  b^{47, 10}_0 ∨  p_470 ∨ break
c  in DIMACS:
-16661 -16662  16663  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 10}_2 ∧ -b^{47, 10}_1 ∧ -b^{47, 10}_0 ∧ true) 
c  in CNF:
c    -b^{47, 10}_2 ∨  b^{47, 10}_1 ∨  b^{47, 10}_0 ∨ false 
c  in DIMACS:
-16661  16662  16663  0

c  3 does not represent an automaton state.
c    -(-b^{47, 10}_2 ∧  b^{47, 10}_1 ∧  b^{47, 10}_0 ∧ true) 
c  in CNF:
c     b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ false 
c  in DIMACS:
 16661 -16662 -16663  0
c  -3 does not represent an automaton state.
c    -( b^{47, 10}_2 ∧  b^{47, 10}_1 ∧  b^{47, 10}_0 ∧ true) 
c  in CNF:
c    -b^{47, 10}_2 ∨ -b^{47, 10}_1 ∨ -b^{47, 10}_0 ∨ false 
c  in DIMACS:
-16661 -16662 -16663  0

c i = 11
c  -2+1 --> -1
c    ( b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧  p_517) -> ( b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0)
c  in CNF:
c    -b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨  b^{47, 12}_2
c    -b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_1
c    -b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨  b^{47, 12}_0
c  in DIMACS:
-16664 -16665  16666 -517  16667 0
-16664 -16665  16666 -517 -16668 0
-16664 -16665  16666 -517  16669 0

c  -1+1 --> 0
c    ( b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0 ∧  p_517) -> (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧ -b^{47, 12}_0)
c  in CNF:
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_2
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_1
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_0
c  in DIMACS:
-16664  16665 -16666 -517 -16667 0
-16664  16665 -16666 -517 -16668 0
-16664  16665 -16666 -517 -16669 0

c  0+1 --> 1
c    (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧  p_517) -> (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0)
c  in CNF:
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_2
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_1
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨  b^{47, 12}_0
c  in DIMACS:
 16664  16665  16666 -517 -16667 0
 16664  16665  16666 -517 -16668 0
 16664  16665  16666 -517  16669 0

c  1+1 --> 2
c    (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0 ∧  p_517) -> (-b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0)
c  in CNF:
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_2
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨  b^{47, 12}_1
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ -p_517 ∨ -b^{47, 12}_0
c  in DIMACS:
 16664  16665 -16666 -517 -16667 0
 16664  16665 -16666 -517  16668 0
 16664  16665 -16666 -517 -16669 0

c  2+1 --> break 
c    (-b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧  p_517) -> break
c  in CNF:
c     b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ -p_517 ∨ break
c  in DIMACS:
 16664 -16665  16666 -517 1162 0


c  2-1 --> 1
c    (-b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧ -p_517) -> (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0)
c  in CNF:
c     b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_2
c     b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_1
c     b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨  b^{47, 12}_0
c  in DIMACS:
 16664 -16665  16666  517 -16667 0
 16664 -16665  16666  517 -16668 0
 16664 -16665  16666  517  16669 0

c  1-1 --> 0
c    (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0 ∧ -p_517) -> (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧ -b^{47, 12}_0)
c  in CNF:
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_2
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_1
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_0
c  in DIMACS:
 16664  16665 -16666  517 -16667 0
 16664  16665 -16666  517 -16668 0
 16664  16665 -16666  517 -16669 0

c  0-1 --> -1
c    (-b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧ -p_517) -> ( b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0)
c  in CNF:
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨  b^{47, 12}_2
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_1
c     b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨  b^{47, 12}_0
c  in DIMACS:
 16664  16665  16666  517  16667 0
 16664  16665  16666  517 -16668 0
 16664  16665  16666  517  16669 0

c  -1-1 --> -2
c    ( b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧  b^{47, 11}_0 ∧ -p_517) -> ( b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0)
c  in CNF:
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨  b^{47, 12}_2
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨  b^{47, 12}_1
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨  p_517 ∨ -b^{47, 12}_0
c  in DIMACS:
-16664  16665 -16666  517  16667 0
-16664  16665 -16666  517  16668 0
-16664  16665 -16666  517 -16669 0

c  -2-1 --> break 
c    ( b^{47, 11}_2 ∧  b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧ -p_517) -> break
c  in CNF:
c    -b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨  b^{47, 11}_0 ∨  p_517 ∨ break
c  in DIMACS:
-16664 -16665  16666  517 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 11}_2 ∧ -b^{47, 11}_1 ∧ -b^{47, 11}_0 ∧ true) 
c  in CNF:
c    -b^{47, 11}_2 ∨  b^{47, 11}_1 ∨  b^{47, 11}_0 ∨ false 
c  in DIMACS:
-16664  16665  16666  0

c  3 does not represent an automaton state.
c    -(-b^{47, 11}_2 ∧  b^{47, 11}_1 ∧  b^{47, 11}_0 ∧ true) 
c  in CNF:
c     b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ false 
c  in DIMACS:
 16664 -16665 -16666  0
c  -3 does not represent an automaton state.
c    -( b^{47, 11}_2 ∧  b^{47, 11}_1 ∧  b^{47, 11}_0 ∧ true) 
c  in CNF:
c    -b^{47, 11}_2 ∨ -b^{47, 11}_1 ∨ -b^{47, 11}_0 ∨ false 
c  in DIMACS:
-16664 -16665 -16666  0

c i = 12
c  -2+1 --> -1
c    ( b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧  p_564) -> ( b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0)
c  in CNF:
c    -b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨  b^{47, 13}_2
c    -b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_1
c    -b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨  b^{47, 13}_0
c  in DIMACS:
-16667 -16668  16669 -564  16670 0
-16667 -16668  16669 -564 -16671 0
-16667 -16668  16669 -564  16672 0

c  -1+1 --> 0
c    ( b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0 ∧  p_564) -> (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧ -b^{47, 13}_0)
c  in CNF:
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_2
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_1
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_0
c  in DIMACS:
-16667  16668 -16669 -564 -16670 0
-16667  16668 -16669 -564 -16671 0
-16667  16668 -16669 -564 -16672 0

c  0+1 --> 1
c    (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧  p_564) -> (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0)
c  in CNF:
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_2
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_1
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨  b^{47, 13}_0
c  in DIMACS:
 16667  16668  16669 -564 -16670 0
 16667  16668  16669 -564 -16671 0
 16667  16668  16669 -564  16672 0

c  1+1 --> 2
c    (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0 ∧  p_564) -> (-b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0)
c  in CNF:
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_2
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨  b^{47, 13}_1
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ -p_564 ∨ -b^{47, 13}_0
c  in DIMACS:
 16667  16668 -16669 -564 -16670 0
 16667  16668 -16669 -564  16671 0
 16667  16668 -16669 -564 -16672 0

c  2+1 --> break 
c    (-b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧  p_564) -> break
c  in CNF:
c     b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 16667 -16668  16669 -564 1162 0


c  2-1 --> 1
c    (-b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧ -p_564) -> (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0)
c  in CNF:
c     b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_2
c     b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_1
c     b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨  b^{47, 13}_0
c  in DIMACS:
 16667 -16668  16669  564 -16670 0
 16667 -16668  16669  564 -16671 0
 16667 -16668  16669  564  16672 0

c  1-1 --> 0
c    (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0 ∧ -p_564) -> (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧ -b^{47, 13}_0)
c  in CNF:
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_2
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_1
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_0
c  in DIMACS:
 16667  16668 -16669  564 -16670 0
 16667  16668 -16669  564 -16671 0
 16667  16668 -16669  564 -16672 0

c  0-1 --> -1
c    (-b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧ -p_564) -> ( b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0)
c  in CNF:
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨  b^{47, 13}_2
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_1
c     b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨  b^{47, 13}_0
c  in DIMACS:
 16667  16668  16669  564  16670 0
 16667  16668  16669  564 -16671 0
 16667  16668  16669  564  16672 0

c  -1-1 --> -2
c    ( b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧  b^{47, 12}_0 ∧ -p_564) -> ( b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0)
c  in CNF:
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨  b^{47, 13}_2
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨  b^{47, 13}_1
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨  p_564 ∨ -b^{47, 13}_0
c  in DIMACS:
-16667  16668 -16669  564  16670 0
-16667  16668 -16669  564  16671 0
-16667  16668 -16669  564 -16672 0

c  -2-1 --> break 
c    ( b^{47, 12}_2 ∧  b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨  b^{47, 12}_0 ∨  p_564 ∨ break
c  in DIMACS:
-16667 -16668  16669  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 12}_2 ∧ -b^{47, 12}_1 ∧ -b^{47, 12}_0 ∧ true) 
c  in CNF:
c    -b^{47, 12}_2 ∨  b^{47, 12}_1 ∨  b^{47, 12}_0 ∨ false 
c  in DIMACS:
-16667  16668  16669  0

c  3 does not represent an automaton state.
c    -(-b^{47, 12}_2 ∧  b^{47, 12}_1 ∧  b^{47, 12}_0 ∧ true) 
c  in CNF:
c     b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ false 
c  in DIMACS:
 16667 -16668 -16669  0
c  -3 does not represent an automaton state.
c    -( b^{47, 12}_2 ∧  b^{47, 12}_1 ∧  b^{47, 12}_0 ∧ true) 
c  in CNF:
c    -b^{47, 12}_2 ∨ -b^{47, 12}_1 ∨ -b^{47, 12}_0 ∨ false 
c  in DIMACS:
-16667 -16668 -16669  0

c i = 13
c  -2+1 --> -1
c    ( b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧  p_611) -> ( b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0)
c  in CNF:
c    -b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨  b^{47, 14}_2
c    -b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_1
c    -b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨  b^{47, 14}_0
c  in DIMACS:
-16670 -16671  16672 -611  16673 0
-16670 -16671  16672 -611 -16674 0
-16670 -16671  16672 -611  16675 0

c  -1+1 --> 0
c    ( b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0 ∧  p_611) -> (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧ -b^{47, 14}_0)
c  in CNF:
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_2
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_1
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_0
c  in DIMACS:
-16670  16671 -16672 -611 -16673 0
-16670  16671 -16672 -611 -16674 0
-16670  16671 -16672 -611 -16675 0

c  0+1 --> 1
c    (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧  p_611) -> (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0)
c  in CNF:
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_2
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_1
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨  b^{47, 14}_0
c  in DIMACS:
 16670  16671  16672 -611 -16673 0
 16670  16671  16672 -611 -16674 0
 16670  16671  16672 -611  16675 0

c  1+1 --> 2
c    (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0 ∧  p_611) -> (-b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0)
c  in CNF:
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_2
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨  b^{47, 14}_1
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ -p_611 ∨ -b^{47, 14}_0
c  in DIMACS:
 16670  16671 -16672 -611 -16673 0
 16670  16671 -16672 -611  16674 0
 16670  16671 -16672 -611 -16675 0

c  2+1 --> break 
c    (-b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧  p_611) -> break
c  in CNF:
c     b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ -p_611 ∨ break
c  in DIMACS:
 16670 -16671  16672 -611 1162 0


c  2-1 --> 1
c    (-b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧ -p_611) -> (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0)
c  in CNF:
c     b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_2
c     b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_1
c     b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨  b^{47, 14}_0
c  in DIMACS:
 16670 -16671  16672  611 -16673 0
 16670 -16671  16672  611 -16674 0
 16670 -16671  16672  611  16675 0

c  1-1 --> 0
c    (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0 ∧ -p_611) -> (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧ -b^{47, 14}_0)
c  in CNF:
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_2
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_1
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_0
c  in DIMACS:
 16670  16671 -16672  611 -16673 0
 16670  16671 -16672  611 -16674 0
 16670  16671 -16672  611 -16675 0

c  0-1 --> -1
c    (-b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧ -p_611) -> ( b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0)
c  in CNF:
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨  b^{47, 14}_2
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_1
c     b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨  b^{47, 14}_0
c  in DIMACS:
 16670  16671  16672  611  16673 0
 16670  16671  16672  611 -16674 0
 16670  16671  16672  611  16675 0

c  -1-1 --> -2
c    ( b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧  b^{47, 13}_0 ∧ -p_611) -> ( b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0)
c  in CNF:
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨  b^{47, 14}_2
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨  b^{47, 14}_1
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨  p_611 ∨ -b^{47, 14}_0
c  in DIMACS:
-16670  16671 -16672  611  16673 0
-16670  16671 -16672  611  16674 0
-16670  16671 -16672  611 -16675 0

c  -2-1 --> break 
c    ( b^{47, 13}_2 ∧  b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧ -p_611) -> break
c  in CNF:
c    -b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨  b^{47, 13}_0 ∨  p_611 ∨ break
c  in DIMACS:
-16670 -16671  16672  611 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 13}_2 ∧ -b^{47, 13}_1 ∧ -b^{47, 13}_0 ∧ true) 
c  in CNF:
c    -b^{47, 13}_2 ∨  b^{47, 13}_1 ∨  b^{47, 13}_0 ∨ false 
c  in DIMACS:
-16670  16671  16672  0

c  3 does not represent an automaton state.
c    -(-b^{47, 13}_2 ∧  b^{47, 13}_1 ∧  b^{47, 13}_0 ∧ true) 
c  in CNF:
c     b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ false 
c  in DIMACS:
 16670 -16671 -16672  0
c  -3 does not represent an automaton state.
c    -( b^{47, 13}_2 ∧  b^{47, 13}_1 ∧  b^{47, 13}_0 ∧ true) 
c  in CNF:
c    -b^{47, 13}_2 ∨ -b^{47, 13}_1 ∨ -b^{47, 13}_0 ∨ false 
c  in DIMACS:
-16670 -16671 -16672  0

c i = 14
c  -2+1 --> -1
c    ( b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧  p_658) -> ( b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0)
c  in CNF:
c    -b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨  b^{47, 15}_2
c    -b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_1
c    -b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨  b^{47, 15}_0
c  in DIMACS:
-16673 -16674  16675 -658  16676 0
-16673 -16674  16675 -658 -16677 0
-16673 -16674  16675 -658  16678 0

c  -1+1 --> 0
c    ( b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0 ∧  p_658) -> (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧ -b^{47, 15}_0)
c  in CNF:
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_2
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_1
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_0
c  in DIMACS:
-16673  16674 -16675 -658 -16676 0
-16673  16674 -16675 -658 -16677 0
-16673  16674 -16675 -658 -16678 0

c  0+1 --> 1
c    (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧  p_658) -> (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0)
c  in CNF:
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_2
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_1
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨  b^{47, 15}_0
c  in DIMACS:
 16673  16674  16675 -658 -16676 0
 16673  16674  16675 -658 -16677 0
 16673  16674  16675 -658  16678 0

c  1+1 --> 2
c    (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0 ∧  p_658) -> (-b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0)
c  in CNF:
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_2
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨  b^{47, 15}_1
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ -p_658 ∨ -b^{47, 15}_0
c  in DIMACS:
 16673  16674 -16675 -658 -16676 0
 16673  16674 -16675 -658  16677 0
 16673  16674 -16675 -658 -16678 0

c  2+1 --> break 
c    (-b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧  p_658) -> break
c  in CNF:
c     b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 16673 -16674  16675 -658 1162 0


c  2-1 --> 1
c    (-b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧ -p_658) -> (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0)
c  in CNF:
c     b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_2
c     b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_1
c     b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨  b^{47, 15}_0
c  in DIMACS:
 16673 -16674  16675  658 -16676 0
 16673 -16674  16675  658 -16677 0
 16673 -16674  16675  658  16678 0

c  1-1 --> 0
c    (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0 ∧ -p_658) -> (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧ -b^{47, 15}_0)
c  in CNF:
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_2
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_1
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_0
c  in DIMACS:
 16673  16674 -16675  658 -16676 0
 16673  16674 -16675  658 -16677 0
 16673  16674 -16675  658 -16678 0

c  0-1 --> -1
c    (-b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧ -p_658) -> ( b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0)
c  in CNF:
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨  b^{47, 15}_2
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_1
c     b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨  b^{47, 15}_0
c  in DIMACS:
 16673  16674  16675  658  16676 0
 16673  16674  16675  658 -16677 0
 16673  16674  16675  658  16678 0

c  -1-1 --> -2
c    ( b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧  b^{47, 14}_0 ∧ -p_658) -> ( b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0)
c  in CNF:
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨  b^{47, 15}_2
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨  b^{47, 15}_1
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨  p_658 ∨ -b^{47, 15}_0
c  in DIMACS:
-16673  16674 -16675  658  16676 0
-16673  16674 -16675  658  16677 0
-16673  16674 -16675  658 -16678 0

c  -2-1 --> break 
c    ( b^{47, 14}_2 ∧  b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨  b^{47, 14}_0 ∨  p_658 ∨ break
c  in DIMACS:
-16673 -16674  16675  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 14}_2 ∧ -b^{47, 14}_1 ∧ -b^{47, 14}_0 ∧ true) 
c  in CNF:
c    -b^{47, 14}_2 ∨  b^{47, 14}_1 ∨  b^{47, 14}_0 ∨ false 
c  in DIMACS:
-16673  16674  16675  0

c  3 does not represent an automaton state.
c    -(-b^{47, 14}_2 ∧  b^{47, 14}_1 ∧  b^{47, 14}_0 ∧ true) 
c  in CNF:
c     b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ false 
c  in DIMACS:
 16673 -16674 -16675  0
c  -3 does not represent an automaton state.
c    -( b^{47, 14}_2 ∧  b^{47, 14}_1 ∧  b^{47, 14}_0 ∧ true) 
c  in CNF:
c    -b^{47, 14}_2 ∨ -b^{47, 14}_1 ∨ -b^{47, 14}_0 ∨ false 
c  in DIMACS:
-16673 -16674 -16675  0

c i = 15
c  -2+1 --> -1
c    ( b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧  p_705) -> ( b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0)
c  in CNF:
c    -b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨  b^{47, 16}_2
c    -b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_1
c    -b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨  b^{47, 16}_0
c  in DIMACS:
-16676 -16677  16678 -705  16679 0
-16676 -16677  16678 -705 -16680 0
-16676 -16677  16678 -705  16681 0

c  -1+1 --> 0
c    ( b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0 ∧  p_705) -> (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧ -b^{47, 16}_0)
c  in CNF:
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_2
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_1
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_0
c  in DIMACS:
-16676  16677 -16678 -705 -16679 0
-16676  16677 -16678 -705 -16680 0
-16676  16677 -16678 -705 -16681 0

c  0+1 --> 1
c    (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧  p_705) -> (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0)
c  in CNF:
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_2
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_1
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨  b^{47, 16}_0
c  in DIMACS:
 16676  16677  16678 -705 -16679 0
 16676  16677  16678 -705 -16680 0
 16676  16677  16678 -705  16681 0

c  1+1 --> 2
c    (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0 ∧  p_705) -> (-b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0)
c  in CNF:
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_2
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨  b^{47, 16}_1
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ -p_705 ∨ -b^{47, 16}_0
c  in DIMACS:
 16676  16677 -16678 -705 -16679 0
 16676  16677 -16678 -705  16680 0
 16676  16677 -16678 -705 -16681 0

c  2+1 --> break 
c    (-b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧  p_705) -> break
c  in CNF:
c     b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 16676 -16677  16678 -705 1162 0


c  2-1 --> 1
c    (-b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧ -p_705) -> (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0)
c  in CNF:
c     b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_2
c     b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_1
c     b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨  b^{47, 16}_0
c  in DIMACS:
 16676 -16677  16678  705 -16679 0
 16676 -16677  16678  705 -16680 0
 16676 -16677  16678  705  16681 0

c  1-1 --> 0
c    (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0 ∧ -p_705) -> (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧ -b^{47, 16}_0)
c  in CNF:
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_2
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_1
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_0
c  in DIMACS:
 16676  16677 -16678  705 -16679 0
 16676  16677 -16678  705 -16680 0
 16676  16677 -16678  705 -16681 0

c  0-1 --> -1
c    (-b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧ -p_705) -> ( b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0)
c  in CNF:
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨  b^{47, 16}_2
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_1
c     b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨  b^{47, 16}_0
c  in DIMACS:
 16676  16677  16678  705  16679 0
 16676  16677  16678  705 -16680 0
 16676  16677  16678  705  16681 0

c  -1-1 --> -2
c    ( b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧  b^{47, 15}_0 ∧ -p_705) -> ( b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0)
c  in CNF:
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨  b^{47, 16}_2
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨  b^{47, 16}_1
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨  p_705 ∨ -b^{47, 16}_0
c  in DIMACS:
-16676  16677 -16678  705  16679 0
-16676  16677 -16678  705  16680 0
-16676  16677 -16678  705 -16681 0

c  -2-1 --> break 
c    ( b^{47, 15}_2 ∧  b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨  b^{47, 15}_0 ∨  p_705 ∨ break
c  in DIMACS:
-16676 -16677  16678  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 15}_2 ∧ -b^{47, 15}_1 ∧ -b^{47, 15}_0 ∧ true) 
c  in CNF:
c    -b^{47, 15}_2 ∨  b^{47, 15}_1 ∨  b^{47, 15}_0 ∨ false 
c  in DIMACS:
-16676  16677  16678  0

c  3 does not represent an automaton state.
c    -(-b^{47, 15}_2 ∧  b^{47, 15}_1 ∧  b^{47, 15}_0 ∧ true) 
c  in CNF:
c     b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ false 
c  in DIMACS:
 16676 -16677 -16678  0
c  -3 does not represent an automaton state.
c    -( b^{47, 15}_2 ∧  b^{47, 15}_1 ∧  b^{47, 15}_0 ∧ true) 
c  in CNF:
c    -b^{47, 15}_2 ∨ -b^{47, 15}_1 ∨ -b^{47, 15}_0 ∨ false 
c  in DIMACS:
-16676 -16677 -16678  0

c i = 16
c  -2+1 --> -1
c    ( b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧  p_752) -> ( b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0)
c  in CNF:
c    -b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨  b^{47, 17}_2
c    -b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_1
c    -b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨  b^{47, 17}_0
c  in DIMACS:
-16679 -16680  16681 -752  16682 0
-16679 -16680  16681 -752 -16683 0
-16679 -16680  16681 -752  16684 0

c  -1+1 --> 0
c    ( b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0 ∧  p_752) -> (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧ -b^{47, 17}_0)
c  in CNF:
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_2
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_1
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_0
c  in DIMACS:
-16679  16680 -16681 -752 -16682 0
-16679  16680 -16681 -752 -16683 0
-16679  16680 -16681 -752 -16684 0

c  0+1 --> 1
c    (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧  p_752) -> (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0)
c  in CNF:
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_2
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_1
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨  b^{47, 17}_0
c  in DIMACS:
 16679  16680  16681 -752 -16682 0
 16679  16680  16681 -752 -16683 0
 16679  16680  16681 -752  16684 0

c  1+1 --> 2
c    (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0 ∧  p_752) -> (-b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0)
c  in CNF:
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_2
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨  b^{47, 17}_1
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ -p_752 ∨ -b^{47, 17}_0
c  in DIMACS:
 16679  16680 -16681 -752 -16682 0
 16679  16680 -16681 -752  16683 0
 16679  16680 -16681 -752 -16684 0

c  2+1 --> break 
c    (-b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧  p_752) -> break
c  in CNF:
c     b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 16679 -16680  16681 -752 1162 0


c  2-1 --> 1
c    (-b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧ -p_752) -> (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0)
c  in CNF:
c     b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_2
c     b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_1
c     b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨  b^{47, 17}_0
c  in DIMACS:
 16679 -16680  16681  752 -16682 0
 16679 -16680  16681  752 -16683 0
 16679 -16680  16681  752  16684 0

c  1-1 --> 0
c    (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0 ∧ -p_752) -> (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧ -b^{47, 17}_0)
c  in CNF:
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_2
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_1
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_0
c  in DIMACS:
 16679  16680 -16681  752 -16682 0
 16679  16680 -16681  752 -16683 0
 16679  16680 -16681  752 -16684 0

c  0-1 --> -1
c    (-b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧ -p_752) -> ( b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0)
c  in CNF:
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨  b^{47, 17}_2
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_1
c     b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨  b^{47, 17}_0
c  in DIMACS:
 16679  16680  16681  752  16682 0
 16679  16680  16681  752 -16683 0
 16679  16680  16681  752  16684 0

c  -1-1 --> -2
c    ( b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧  b^{47, 16}_0 ∧ -p_752) -> ( b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0)
c  in CNF:
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨  b^{47, 17}_2
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨  b^{47, 17}_1
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨  p_752 ∨ -b^{47, 17}_0
c  in DIMACS:
-16679  16680 -16681  752  16682 0
-16679  16680 -16681  752  16683 0
-16679  16680 -16681  752 -16684 0

c  -2-1 --> break 
c    ( b^{47, 16}_2 ∧  b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨  b^{47, 16}_0 ∨  p_752 ∨ break
c  in DIMACS:
-16679 -16680  16681  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 16}_2 ∧ -b^{47, 16}_1 ∧ -b^{47, 16}_0 ∧ true) 
c  in CNF:
c    -b^{47, 16}_2 ∨  b^{47, 16}_1 ∨  b^{47, 16}_0 ∨ false 
c  in DIMACS:
-16679  16680  16681  0

c  3 does not represent an automaton state.
c    -(-b^{47, 16}_2 ∧  b^{47, 16}_1 ∧  b^{47, 16}_0 ∧ true) 
c  in CNF:
c     b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ false 
c  in DIMACS:
 16679 -16680 -16681  0
c  -3 does not represent an automaton state.
c    -( b^{47, 16}_2 ∧  b^{47, 16}_1 ∧  b^{47, 16}_0 ∧ true) 
c  in CNF:
c    -b^{47, 16}_2 ∨ -b^{47, 16}_1 ∨ -b^{47, 16}_0 ∨ false 
c  in DIMACS:
-16679 -16680 -16681  0

c i = 17
c  -2+1 --> -1
c    ( b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧  p_799) -> ( b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0)
c  in CNF:
c    -b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨  b^{47, 18}_2
c    -b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_1
c    -b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨  b^{47, 18}_0
c  in DIMACS:
-16682 -16683  16684 -799  16685 0
-16682 -16683  16684 -799 -16686 0
-16682 -16683  16684 -799  16687 0

c  -1+1 --> 0
c    ( b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0 ∧  p_799) -> (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧ -b^{47, 18}_0)
c  in CNF:
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_2
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_1
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_0
c  in DIMACS:
-16682  16683 -16684 -799 -16685 0
-16682  16683 -16684 -799 -16686 0
-16682  16683 -16684 -799 -16687 0

c  0+1 --> 1
c    (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧  p_799) -> (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0)
c  in CNF:
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_2
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_1
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨  b^{47, 18}_0
c  in DIMACS:
 16682  16683  16684 -799 -16685 0
 16682  16683  16684 -799 -16686 0
 16682  16683  16684 -799  16687 0

c  1+1 --> 2
c    (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0 ∧  p_799) -> (-b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0)
c  in CNF:
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_2
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨  b^{47, 18}_1
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ -p_799 ∨ -b^{47, 18}_0
c  in DIMACS:
 16682  16683 -16684 -799 -16685 0
 16682  16683 -16684 -799  16686 0
 16682  16683 -16684 -799 -16687 0

c  2+1 --> break 
c    (-b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧  p_799) -> break
c  in CNF:
c     b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ -p_799 ∨ break
c  in DIMACS:
 16682 -16683  16684 -799 1162 0


c  2-1 --> 1
c    (-b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧ -p_799) -> (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0)
c  in CNF:
c     b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_2
c     b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_1
c     b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨  b^{47, 18}_0
c  in DIMACS:
 16682 -16683  16684  799 -16685 0
 16682 -16683  16684  799 -16686 0
 16682 -16683  16684  799  16687 0

c  1-1 --> 0
c    (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0 ∧ -p_799) -> (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧ -b^{47, 18}_0)
c  in CNF:
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_2
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_1
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_0
c  in DIMACS:
 16682  16683 -16684  799 -16685 0
 16682  16683 -16684  799 -16686 0
 16682  16683 -16684  799 -16687 0

c  0-1 --> -1
c    (-b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧ -p_799) -> ( b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0)
c  in CNF:
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨  b^{47, 18}_2
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_1
c     b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨  b^{47, 18}_0
c  in DIMACS:
 16682  16683  16684  799  16685 0
 16682  16683  16684  799 -16686 0
 16682  16683  16684  799  16687 0

c  -1-1 --> -2
c    ( b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧  b^{47, 17}_0 ∧ -p_799) -> ( b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0)
c  in CNF:
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨  b^{47, 18}_2
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨  b^{47, 18}_1
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨  p_799 ∨ -b^{47, 18}_0
c  in DIMACS:
-16682  16683 -16684  799  16685 0
-16682  16683 -16684  799  16686 0
-16682  16683 -16684  799 -16687 0

c  -2-1 --> break 
c    ( b^{47, 17}_2 ∧  b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧ -p_799) -> break
c  in CNF:
c    -b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨  b^{47, 17}_0 ∨  p_799 ∨ break
c  in DIMACS:
-16682 -16683  16684  799 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 17}_2 ∧ -b^{47, 17}_1 ∧ -b^{47, 17}_0 ∧ true) 
c  in CNF:
c    -b^{47, 17}_2 ∨  b^{47, 17}_1 ∨  b^{47, 17}_0 ∨ false 
c  in DIMACS:
-16682  16683  16684  0

c  3 does not represent an automaton state.
c    -(-b^{47, 17}_2 ∧  b^{47, 17}_1 ∧  b^{47, 17}_0 ∧ true) 
c  in CNF:
c     b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ false 
c  in DIMACS:
 16682 -16683 -16684  0
c  -3 does not represent an automaton state.
c    -( b^{47, 17}_2 ∧  b^{47, 17}_1 ∧  b^{47, 17}_0 ∧ true) 
c  in CNF:
c    -b^{47, 17}_2 ∨ -b^{47, 17}_1 ∨ -b^{47, 17}_0 ∨ false 
c  in DIMACS:
-16682 -16683 -16684  0

c i = 18
c  -2+1 --> -1
c    ( b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧  p_846) -> ( b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0)
c  in CNF:
c    -b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨  b^{47, 19}_2
c    -b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_1
c    -b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨  b^{47, 19}_0
c  in DIMACS:
-16685 -16686  16687 -846  16688 0
-16685 -16686  16687 -846 -16689 0
-16685 -16686  16687 -846  16690 0

c  -1+1 --> 0
c    ( b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0 ∧  p_846) -> (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧ -b^{47, 19}_0)
c  in CNF:
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_2
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_1
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_0
c  in DIMACS:
-16685  16686 -16687 -846 -16688 0
-16685  16686 -16687 -846 -16689 0
-16685  16686 -16687 -846 -16690 0

c  0+1 --> 1
c    (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧  p_846) -> (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0)
c  in CNF:
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_2
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_1
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨  b^{47, 19}_0
c  in DIMACS:
 16685  16686  16687 -846 -16688 0
 16685  16686  16687 -846 -16689 0
 16685  16686  16687 -846  16690 0

c  1+1 --> 2
c    (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0 ∧  p_846) -> (-b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0)
c  in CNF:
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_2
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨  b^{47, 19}_1
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ -p_846 ∨ -b^{47, 19}_0
c  in DIMACS:
 16685  16686 -16687 -846 -16688 0
 16685  16686 -16687 -846  16689 0
 16685  16686 -16687 -846 -16690 0

c  2+1 --> break 
c    (-b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧  p_846) -> break
c  in CNF:
c     b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 16685 -16686  16687 -846 1162 0


c  2-1 --> 1
c    (-b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧ -p_846) -> (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0)
c  in CNF:
c     b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_2
c     b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_1
c     b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨  b^{47, 19}_0
c  in DIMACS:
 16685 -16686  16687  846 -16688 0
 16685 -16686  16687  846 -16689 0
 16685 -16686  16687  846  16690 0

c  1-1 --> 0
c    (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0 ∧ -p_846) -> (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧ -b^{47, 19}_0)
c  in CNF:
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_2
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_1
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_0
c  in DIMACS:
 16685  16686 -16687  846 -16688 0
 16685  16686 -16687  846 -16689 0
 16685  16686 -16687  846 -16690 0

c  0-1 --> -1
c    (-b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧ -p_846) -> ( b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0)
c  in CNF:
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨  b^{47, 19}_2
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_1
c     b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨  b^{47, 19}_0
c  in DIMACS:
 16685  16686  16687  846  16688 0
 16685  16686  16687  846 -16689 0
 16685  16686  16687  846  16690 0

c  -1-1 --> -2
c    ( b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧  b^{47, 18}_0 ∧ -p_846) -> ( b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0)
c  in CNF:
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨  b^{47, 19}_2
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨  b^{47, 19}_1
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨  p_846 ∨ -b^{47, 19}_0
c  in DIMACS:
-16685  16686 -16687  846  16688 0
-16685  16686 -16687  846  16689 0
-16685  16686 -16687  846 -16690 0

c  -2-1 --> break 
c    ( b^{47, 18}_2 ∧  b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨  b^{47, 18}_0 ∨  p_846 ∨ break
c  in DIMACS:
-16685 -16686  16687  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 18}_2 ∧ -b^{47, 18}_1 ∧ -b^{47, 18}_0 ∧ true) 
c  in CNF:
c    -b^{47, 18}_2 ∨  b^{47, 18}_1 ∨  b^{47, 18}_0 ∨ false 
c  in DIMACS:
-16685  16686  16687  0

c  3 does not represent an automaton state.
c    -(-b^{47, 18}_2 ∧  b^{47, 18}_1 ∧  b^{47, 18}_0 ∧ true) 
c  in CNF:
c     b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ false 
c  in DIMACS:
 16685 -16686 -16687  0
c  -3 does not represent an automaton state.
c    -( b^{47, 18}_2 ∧  b^{47, 18}_1 ∧  b^{47, 18}_0 ∧ true) 
c  in CNF:
c    -b^{47, 18}_2 ∨ -b^{47, 18}_1 ∨ -b^{47, 18}_0 ∨ false 
c  in DIMACS:
-16685 -16686 -16687  0

c i = 19
c  -2+1 --> -1
c    ( b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧  p_893) -> ( b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0)
c  in CNF:
c    -b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨  b^{47, 20}_2
c    -b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_1
c    -b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨  b^{47, 20}_0
c  in DIMACS:
-16688 -16689  16690 -893  16691 0
-16688 -16689  16690 -893 -16692 0
-16688 -16689  16690 -893  16693 0

c  -1+1 --> 0
c    ( b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0 ∧  p_893) -> (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧ -b^{47, 20}_0)
c  in CNF:
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_2
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_1
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_0
c  in DIMACS:
-16688  16689 -16690 -893 -16691 0
-16688  16689 -16690 -893 -16692 0
-16688  16689 -16690 -893 -16693 0

c  0+1 --> 1
c    (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧  p_893) -> (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0)
c  in CNF:
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_2
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_1
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨  b^{47, 20}_0
c  in DIMACS:
 16688  16689  16690 -893 -16691 0
 16688  16689  16690 -893 -16692 0
 16688  16689  16690 -893  16693 0

c  1+1 --> 2
c    (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0 ∧  p_893) -> (-b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0)
c  in CNF:
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_2
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨  b^{47, 20}_1
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ -p_893 ∨ -b^{47, 20}_0
c  in DIMACS:
 16688  16689 -16690 -893 -16691 0
 16688  16689 -16690 -893  16692 0
 16688  16689 -16690 -893 -16693 0

c  2+1 --> break 
c    (-b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧  p_893) -> break
c  in CNF:
c     b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ -p_893 ∨ break
c  in DIMACS:
 16688 -16689  16690 -893 1162 0


c  2-1 --> 1
c    (-b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧ -p_893) -> (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0)
c  in CNF:
c     b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_2
c     b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_1
c     b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨  b^{47, 20}_0
c  in DIMACS:
 16688 -16689  16690  893 -16691 0
 16688 -16689  16690  893 -16692 0
 16688 -16689  16690  893  16693 0

c  1-1 --> 0
c    (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0 ∧ -p_893) -> (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧ -b^{47, 20}_0)
c  in CNF:
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_2
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_1
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_0
c  in DIMACS:
 16688  16689 -16690  893 -16691 0
 16688  16689 -16690  893 -16692 0
 16688  16689 -16690  893 -16693 0

c  0-1 --> -1
c    (-b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧ -p_893) -> ( b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0)
c  in CNF:
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨  b^{47, 20}_2
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_1
c     b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨  b^{47, 20}_0
c  in DIMACS:
 16688  16689  16690  893  16691 0
 16688  16689  16690  893 -16692 0
 16688  16689  16690  893  16693 0

c  -1-1 --> -2
c    ( b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧  b^{47, 19}_0 ∧ -p_893) -> ( b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0)
c  in CNF:
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨  b^{47, 20}_2
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨  b^{47, 20}_1
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨  p_893 ∨ -b^{47, 20}_0
c  in DIMACS:
-16688  16689 -16690  893  16691 0
-16688  16689 -16690  893  16692 0
-16688  16689 -16690  893 -16693 0

c  -2-1 --> break 
c    ( b^{47, 19}_2 ∧  b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧ -p_893) -> break
c  in CNF:
c    -b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨  b^{47, 19}_0 ∨  p_893 ∨ break
c  in DIMACS:
-16688 -16689  16690  893 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 19}_2 ∧ -b^{47, 19}_1 ∧ -b^{47, 19}_0 ∧ true) 
c  in CNF:
c    -b^{47, 19}_2 ∨  b^{47, 19}_1 ∨  b^{47, 19}_0 ∨ false 
c  in DIMACS:
-16688  16689  16690  0

c  3 does not represent an automaton state.
c    -(-b^{47, 19}_2 ∧  b^{47, 19}_1 ∧  b^{47, 19}_0 ∧ true) 
c  in CNF:
c     b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ false 
c  in DIMACS:
 16688 -16689 -16690  0
c  -3 does not represent an automaton state.
c    -( b^{47, 19}_2 ∧  b^{47, 19}_1 ∧  b^{47, 19}_0 ∧ true) 
c  in CNF:
c    -b^{47, 19}_2 ∨ -b^{47, 19}_1 ∨ -b^{47, 19}_0 ∨ false 
c  in DIMACS:
-16688 -16689 -16690  0

c i = 20
c  -2+1 --> -1
c    ( b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧  p_940) -> ( b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0)
c  in CNF:
c    -b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨  b^{47, 21}_2
c    -b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_1
c    -b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨  b^{47, 21}_0
c  in DIMACS:
-16691 -16692  16693 -940  16694 0
-16691 -16692  16693 -940 -16695 0
-16691 -16692  16693 -940  16696 0

c  -1+1 --> 0
c    ( b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0 ∧  p_940) -> (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧ -b^{47, 21}_0)
c  in CNF:
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_2
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_1
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_0
c  in DIMACS:
-16691  16692 -16693 -940 -16694 0
-16691  16692 -16693 -940 -16695 0
-16691  16692 -16693 -940 -16696 0

c  0+1 --> 1
c    (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧  p_940) -> (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0)
c  in CNF:
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_2
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_1
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨  b^{47, 21}_0
c  in DIMACS:
 16691  16692  16693 -940 -16694 0
 16691  16692  16693 -940 -16695 0
 16691  16692  16693 -940  16696 0

c  1+1 --> 2
c    (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0 ∧  p_940) -> (-b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0)
c  in CNF:
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_2
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨  b^{47, 21}_1
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ -p_940 ∨ -b^{47, 21}_0
c  in DIMACS:
 16691  16692 -16693 -940 -16694 0
 16691  16692 -16693 -940  16695 0
 16691  16692 -16693 -940 -16696 0

c  2+1 --> break 
c    (-b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧  p_940) -> break
c  in CNF:
c     b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 16691 -16692  16693 -940 1162 0


c  2-1 --> 1
c    (-b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧ -p_940) -> (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0)
c  in CNF:
c     b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_2
c     b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_1
c     b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨  b^{47, 21}_0
c  in DIMACS:
 16691 -16692  16693  940 -16694 0
 16691 -16692  16693  940 -16695 0
 16691 -16692  16693  940  16696 0

c  1-1 --> 0
c    (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0 ∧ -p_940) -> (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧ -b^{47, 21}_0)
c  in CNF:
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_2
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_1
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_0
c  in DIMACS:
 16691  16692 -16693  940 -16694 0
 16691  16692 -16693  940 -16695 0
 16691  16692 -16693  940 -16696 0

c  0-1 --> -1
c    (-b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧ -p_940) -> ( b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0)
c  in CNF:
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨  b^{47, 21}_2
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_1
c     b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨  b^{47, 21}_0
c  in DIMACS:
 16691  16692  16693  940  16694 0
 16691  16692  16693  940 -16695 0
 16691  16692  16693  940  16696 0

c  -1-1 --> -2
c    ( b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧  b^{47, 20}_0 ∧ -p_940) -> ( b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0)
c  in CNF:
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨  b^{47, 21}_2
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨  b^{47, 21}_1
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨  p_940 ∨ -b^{47, 21}_0
c  in DIMACS:
-16691  16692 -16693  940  16694 0
-16691  16692 -16693  940  16695 0
-16691  16692 -16693  940 -16696 0

c  -2-1 --> break 
c    ( b^{47, 20}_2 ∧  b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨  b^{47, 20}_0 ∨  p_940 ∨ break
c  in DIMACS:
-16691 -16692  16693  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 20}_2 ∧ -b^{47, 20}_1 ∧ -b^{47, 20}_0 ∧ true) 
c  in CNF:
c    -b^{47, 20}_2 ∨  b^{47, 20}_1 ∨  b^{47, 20}_0 ∨ false 
c  in DIMACS:
-16691  16692  16693  0

c  3 does not represent an automaton state.
c    -(-b^{47, 20}_2 ∧  b^{47, 20}_1 ∧  b^{47, 20}_0 ∧ true) 
c  in CNF:
c     b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ false 
c  in DIMACS:
 16691 -16692 -16693  0
c  -3 does not represent an automaton state.
c    -( b^{47, 20}_2 ∧  b^{47, 20}_1 ∧  b^{47, 20}_0 ∧ true) 
c  in CNF:
c    -b^{47, 20}_2 ∨ -b^{47, 20}_1 ∨ -b^{47, 20}_0 ∨ false 
c  in DIMACS:
-16691 -16692 -16693  0

c i = 21
c  -2+1 --> -1
c    ( b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧  p_987) -> ( b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0)
c  in CNF:
c    -b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨  b^{47, 22}_2
c    -b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_1
c    -b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨  b^{47, 22}_0
c  in DIMACS:
-16694 -16695  16696 -987  16697 0
-16694 -16695  16696 -987 -16698 0
-16694 -16695  16696 -987  16699 0

c  -1+1 --> 0
c    ( b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0 ∧  p_987) -> (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧ -b^{47, 22}_0)
c  in CNF:
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_2
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_1
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_0
c  in DIMACS:
-16694  16695 -16696 -987 -16697 0
-16694  16695 -16696 -987 -16698 0
-16694  16695 -16696 -987 -16699 0

c  0+1 --> 1
c    (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧  p_987) -> (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0)
c  in CNF:
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_2
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_1
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨  b^{47, 22}_0
c  in DIMACS:
 16694  16695  16696 -987 -16697 0
 16694  16695  16696 -987 -16698 0
 16694  16695  16696 -987  16699 0

c  1+1 --> 2
c    (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0 ∧  p_987) -> (-b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0)
c  in CNF:
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_2
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨  b^{47, 22}_1
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ -p_987 ∨ -b^{47, 22}_0
c  in DIMACS:
 16694  16695 -16696 -987 -16697 0
 16694  16695 -16696 -987  16698 0
 16694  16695 -16696 -987 -16699 0

c  2+1 --> break 
c    (-b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧  p_987) -> break
c  in CNF:
c     b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 16694 -16695  16696 -987 1162 0


c  2-1 --> 1
c    (-b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧ -p_987) -> (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0)
c  in CNF:
c     b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_2
c     b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_1
c     b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨  b^{47, 22}_0
c  in DIMACS:
 16694 -16695  16696  987 -16697 0
 16694 -16695  16696  987 -16698 0
 16694 -16695  16696  987  16699 0

c  1-1 --> 0
c    (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0 ∧ -p_987) -> (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧ -b^{47, 22}_0)
c  in CNF:
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_2
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_1
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_0
c  in DIMACS:
 16694  16695 -16696  987 -16697 0
 16694  16695 -16696  987 -16698 0
 16694  16695 -16696  987 -16699 0

c  0-1 --> -1
c    (-b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧ -p_987) -> ( b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0)
c  in CNF:
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨  b^{47, 22}_2
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_1
c     b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨  b^{47, 22}_0
c  in DIMACS:
 16694  16695  16696  987  16697 0
 16694  16695  16696  987 -16698 0
 16694  16695  16696  987  16699 0

c  -1-1 --> -2
c    ( b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧  b^{47, 21}_0 ∧ -p_987) -> ( b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0)
c  in CNF:
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨  b^{47, 22}_2
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨  b^{47, 22}_1
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨  p_987 ∨ -b^{47, 22}_0
c  in DIMACS:
-16694  16695 -16696  987  16697 0
-16694  16695 -16696  987  16698 0
-16694  16695 -16696  987 -16699 0

c  -2-1 --> break 
c    ( b^{47, 21}_2 ∧  b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨  b^{47, 21}_0 ∨  p_987 ∨ break
c  in DIMACS:
-16694 -16695  16696  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 21}_2 ∧ -b^{47, 21}_1 ∧ -b^{47, 21}_0 ∧ true) 
c  in CNF:
c    -b^{47, 21}_2 ∨  b^{47, 21}_1 ∨  b^{47, 21}_0 ∨ false 
c  in DIMACS:
-16694  16695  16696  0

c  3 does not represent an automaton state.
c    -(-b^{47, 21}_2 ∧  b^{47, 21}_1 ∧  b^{47, 21}_0 ∧ true) 
c  in CNF:
c     b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ false 
c  in DIMACS:
 16694 -16695 -16696  0
c  -3 does not represent an automaton state.
c    -( b^{47, 21}_2 ∧  b^{47, 21}_1 ∧  b^{47, 21}_0 ∧ true) 
c  in CNF:
c    -b^{47, 21}_2 ∨ -b^{47, 21}_1 ∨ -b^{47, 21}_0 ∨ false 
c  in DIMACS:
-16694 -16695 -16696  0

c i = 22
c  -2+1 --> -1
c    ( b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧  p_1034) -> ( b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0)
c  in CNF:
c    -b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨  b^{47, 23}_2
c    -b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_1
c    -b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨  b^{47, 23}_0
c  in DIMACS:
-16697 -16698  16699 -1034  16700 0
-16697 -16698  16699 -1034 -16701 0
-16697 -16698  16699 -1034  16702 0

c  -1+1 --> 0
c    ( b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0 ∧  p_1034) -> (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧ -b^{47, 23}_0)
c  in CNF:
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_2
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_1
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_0
c  in DIMACS:
-16697  16698 -16699 -1034 -16700 0
-16697  16698 -16699 -1034 -16701 0
-16697  16698 -16699 -1034 -16702 0

c  0+1 --> 1
c    (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧  p_1034) -> (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0)
c  in CNF:
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_2
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_1
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨  b^{47, 23}_0
c  in DIMACS:
 16697  16698  16699 -1034 -16700 0
 16697  16698  16699 -1034 -16701 0
 16697  16698  16699 -1034  16702 0

c  1+1 --> 2
c    (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0 ∧  p_1034) -> (-b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0)
c  in CNF:
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_2
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨  b^{47, 23}_1
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ -p_1034 ∨ -b^{47, 23}_0
c  in DIMACS:
 16697  16698 -16699 -1034 -16700 0
 16697  16698 -16699 -1034  16701 0
 16697  16698 -16699 -1034 -16702 0

c  2+1 --> break 
c    (-b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 16697 -16698  16699 -1034 1162 0


c  2-1 --> 1
c    (-b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧ -p_1034) -> (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0)
c  in CNF:
c     b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_2
c     b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_1
c     b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨  b^{47, 23}_0
c  in DIMACS:
 16697 -16698  16699  1034 -16700 0
 16697 -16698  16699  1034 -16701 0
 16697 -16698  16699  1034  16702 0

c  1-1 --> 0
c    (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0 ∧ -p_1034) -> (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧ -b^{47, 23}_0)
c  in CNF:
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_2
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_1
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_0
c  in DIMACS:
 16697  16698 -16699  1034 -16700 0
 16697  16698 -16699  1034 -16701 0
 16697  16698 -16699  1034 -16702 0

c  0-1 --> -1
c    (-b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧ -p_1034) -> ( b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0)
c  in CNF:
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨  b^{47, 23}_2
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_1
c     b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨  b^{47, 23}_0
c  in DIMACS:
 16697  16698  16699  1034  16700 0
 16697  16698  16699  1034 -16701 0
 16697  16698  16699  1034  16702 0

c  -1-1 --> -2
c    ( b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧  b^{47, 22}_0 ∧ -p_1034) -> ( b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0)
c  in CNF:
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨  b^{47, 23}_2
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨  b^{47, 23}_1
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨  p_1034 ∨ -b^{47, 23}_0
c  in DIMACS:
-16697  16698 -16699  1034  16700 0
-16697  16698 -16699  1034  16701 0
-16697  16698 -16699  1034 -16702 0

c  -2-1 --> break 
c    ( b^{47, 22}_2 ∧  b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨  b^{47, 22}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-16697 -16698  16699  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 22}_2 ∧ -b^{47, 22}_1 ∧ -b^{47, 22}_0 ∧ true) 
c  in CNF:
c    -b^{47, 22}_2 ∨  b^{47, 22}_1 ∨  b^{47, 22}_0 ∨ false 
c  in DIMACS:
-16697  16698  16699  0

c  3 does not represent an automaton state.
c    -(-b^{47, 22}_2 ∧  b^{47, 22}_1 ∧  b^{47, 22}_0 ∧ true) 
c  in CNF:
c     b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ false 
c  in DIMACS:
 16697 -16698 -16699  0
c  -3 does not represent an automaton state.
c    -( b^{47, 22}_2 ∧  b^{47, 22}_1 ∧  b^{47, 22}_0 ∧ true) 
c  in CNF:
c    -b^{47, 22}_2 ∨ -b^{47, 22}_1 ∨ -b^{47, 22}_0 ∨ false 
c  in DIMACS:
-16697 -16698 -16699  0

c i = 23
c  -2+1 --> -1
c    ( b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧  p_1081) -> ( b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0)
c  in CNF:
c    -b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨  b^{47, 24}_2
c    -b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_1
c    -b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨  b^{47, 24}_0
c  in DIMACS:
-16700 -16701  16702 -1081  16703 0
-16700 -16701  16702 -1081 -16704 0
-16700 -16701  16702 -1081  16705 0

c  -1+1 --> 0
c    ( b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0 ∧  p_1081) -> (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧ -b^{47, 24}_0)
c  in CNF:
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_2
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_1
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_0
c  in DIMACS:
-16700  16701 -16702 -1081 -16703 0
-16700  16701 -16702 -1081 -16704 0
-16700  16701 -16702 -1081 -16705 0

c  0+1 --> 1
c    (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧  p_1081) -> (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0)
c  in CNF:
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_2
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_1
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨  b^{47, 24}_0
c  in DIMACS:
 16700  16701  16702 -1081 -16703 0
 16700  16701  16702 -1081 -16704 0
 16700  16701  16702 -1081  16705 0

c  1+1 --> 2
c    (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0 ∧  p_1081) -> (-b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0)
c  in CNF:
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_2
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨  b^{47, 24}_1
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ -p_1081 ∨ -b^{47, 24}_0
c  in DIMACS:
 16700  16701 -16702 -1081 -16703 0
 16700  16701 -16702 -1081  16704 0
 16700  16701 -16702 -1081 -16705 0

c  2+1 --> break 
c    (-b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧  p_1081) -> break
c  in CNF:
c     b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ -p_1081 ∨ break
c  in DIMACS:
 16700 -16701  16702 -1081 1162 0


c  2-1 --> 1
c    (-b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧ -p_1081) -> (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0)
c  in CNF:
c     b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_2
c     b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_1
c     b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨  b^{47, 24}_0
c  in DIMACS:
 16700 -16701  16702  1081 -16703 0
 16700 -16701  16702  1081 -16704 0
 16700 -16701  16702  1081  16705 0

c  1-1 --> 0
c    (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0 ∧ -p_1081) -> (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧ -b^{47, 24}_0)
c  in CNF:
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_2
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_1
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_0
c  in DIMACS:
 16700  16701 -16702  1081 -16703 0
 16700  16701 -16702  1081 -16704 0
 16700  16701 -16702  1081 -16705 0

c  0-1 --> -1
c    (-b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧ -p_1081) -> ( b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0)
c  in CNF:
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨  b^{47, 24}_2
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_1
c     b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨  b^{47, 24}_0
c  in DIMACS:
 16700  16701  16702  1081  16703 0
 16700  16701  16702  1081 -16704 0
 16700  16701  16702  1081  16705 0

c  -1-1 --> -2
c    ( b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧  b^{47, 23}_0 ∧ -p_1081) -> ( b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0)
c  in CNF:
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨  b^{47, 24}_2
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨  b^{47, 24}_1
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨  p_1081 ∨ -b^{47, 24}_0
c  in DIMACS:
-16700  16701 -16702  1081  16703 0
-16700  16701 -16702  1081  16704 0
-16700  16701 -16702  1081 -16705 0

c  -2-1 --> break 
c    ( b^{47, 23}_2 ∧  b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧ -p_1081) -> break
c  in CNF:
c    -b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨  b^{47, 23}_0 ∨  p_1081 ∨ break
c  in DIMACS:
-16700 -16701  16702  1081 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 23}_2 ∧ -b^{47, 23}_1 ∧ -b^{47, 23}_0 ∧ true) 
c  in CNF:
c    -b^{47, 23}_2 ∨  b^{47, 23}_1 ∨  b^{47, 23}_0 ∨ false 
c  in DIMACS:
-16700  16701  16702  0

c  3 does not represent an automaton state.
c    -(-b^{47, 23}_2 ∧  b^{47, 23}_1 ∧  b^{47, 23}_0 ∧ true) 
c  in CNF:
c     b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ false 
c  in DIMACS:
 16700 -16701 -16702  0
c  -3 does not represent an automaton state.
c    -( b^{47, 23}_2 ∧  b^{47, 23}_1 ∧  b^{47, 23}_0 ∧ true) 
c  in CNF:
c    -b^{47, 23}_2 ∨ -b^{47, 23}_1 ∨ -b^{47, 23}_0 ∨ false 
c  in DIMACS:
-16700 -16701 -16702  0

c i = 24
c  -2+1 --> -1
c    ( b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧  p_1128) -> ( b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧  b^{47, 25}_0)
c  in CNF:
c    -b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨  b^{47, 25}_2
c    -b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_1
c    -b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨  b^{47, 25}_0
c  in DIMACS:
-16703 -16704  16705 -1128  16706 0
-16703 -16704  16705 -1128 -16707 0
-16703 -16704  16705 -1128  16708 0

c  -1+1 --> 0
c    ( b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0 ∧  p_1128) -> (-b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧ -b^{47, 25}_0)
c  in CNF:
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_2
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_1
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_0
c  in DIMACS:
-16703  16704 -16705 -1128 -16706 0
-16703  16704 -16705 -1128 -16707 0
-16703  16704 -16705 -1128 -16708 0

c  0+1 --> 1
c    (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧  p_1128) -> (-b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧  b^{47, 25}_0)
c  in CNF:
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_2
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_1
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨  b^{47, 25}_0
c  in DIMACS:
 16703  16704  16705 -1128 -16706 0
 16703  16704  16705 -1128 -16707 0
 16703  16704  16705 -1128  16708 0

c  1+1 --> 2
c    (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0 ∧  p_1128) -> (-b^{47, 25}_2 ∧  b^{47, 25}_1 ∧ -b^{47, 25}_0)
c  in CNF:
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_2
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨  b^{47, 25}_1
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ -p_1128 ∨ -b^{47, 25}_0
c  in DIMACS:
 16703  16704 -16705 -1128 -16706 0
 16703  16704 -16705 -1128  16707 0
 16703  16704 -16705 -1128 -16708 0

c  2+1 --> break 
c    (-b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 16703 -16704  16705 -1128 1162 0


c  2-1 --> 1
c    (-b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧ -p_1128) -> (-b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧  b^{47, 25}_0)
c  in CNF:
c     b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_2
c     b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_1
c     b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨  b^{47, 25}_0
c  in DIMACS:
 16703 -16704  16705  1128 -16706 0
 16703 -16704  16705  1128 -16707 0
 16703 -16704  16705  1128  16708 0

c  1-1 --> 0
c    (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0 ∧ -p_1128) -> (-b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧ -b^{47, 25}_0)
c  in CNF:
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_2
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_1
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_0
c  in DIMACS:
 16703  16704 -16705  1128 -16706 0
 16703  16704 -16705  1128 -16707 0
 16703  16704 -16705  1128 -16708 0

c  0-1 --> -1
c    (-b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧ -p_1128) -> ( b^{47, 25}_2 ∧ -b^{47, 25}_1 ∧  b^{47, 25}_0)
c  in CNF:
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨  b^{47, 25}_2
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_1
c     b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨  b^{47, 25}_0
c  in DIMACS:
 16703  16704  16705  1128  16706 0
 16703  16704  16705  1128 -16707 0
 16703  16704  16705  1128  16708 0

c  -1-1 --> -2
c    ( b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧  b^{47, 24}_0 ∧ -p_1128) -> ( b^{47, 25}_2 ∧  b^{47, 25}_1 ∧ -b^{47, 25}_0)
c  in CNF:
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨  b^{47, 25}_2
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨  b^{47, 25}_1
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨  p_1128 ∨ -b^{47, 25}_0
c  in DIMACS:
-16703  16704 -16705  1128  16706 0
-16703  16704 -16705  1128  16707 0
-16703  16704 -16705  1128 -16708 0

c  -2-1 --> break 
c    ( b^{47, 24}_2 ∧  b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨  b^{47, 24}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-16703 -16704  16705  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{47, 24}_2 ∧ -b^{47, 24}_1 ∧ -b^{47, 24}_0 ∧ true) 
c  in CNF:
c    -b^{47, 24}_2 ∨  b^{47, 24}_1 ∨  b^{47, 24}_0 ∨ false 
c  in DIMACS:
-16703  16704  16705  0

c  3 does not represent an automaton state.
c    -(-b^{47, 24}_2 ∧  b^{47, 24}_1 ∧  b^{47, 24}_0 ∧ true) 
c  in CNF:
c     b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ false 
c  in DIMACS:
 16703 -16704 -16705  0
c  -3 does not represent an automaton state.
c    -( b^{47, 24}_2 ∧  b^{47, 24}_1 ∧  b^{47, 24}_0 ∧ true) 
c  in CNF:
c    -b^{47, 24}_2 ∨ -b^{47, 24}_1 ∨ -b^{47, 24}_0 ∨ false 
c  in DIMACS:
-16703 -16704 -16705  0

c INIT for k = 48
c    -b^{48, 1}_2
c    -b^{48, 1}_1
c    -b^{48, 1}_0
c  in DIMACS:
-16709 0
-16710 0
-16711 0

c Transitions for k = 48
c i = 1
c  -2+1 --> -1
c    ( b^{48, 1}_2 ∧  b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧  p_48) -> ( b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0)
c  in CNF:
c    -b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨  b^{48, 2}_2
c    -b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_1
c    -b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨  b^{48, 2}_0
c  in DIMACS:
-16709 -16710  16711 -48  16712 0
-16709 -16710  16711 -48 -16713 0
-16709 -16710  16711 -48  16714 0

c  -1+1 --> 0
c    ( b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧  b^{48, 1}_0 ∧  p_48) -> (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧ -b^{48, 2}_0)
c  in CNF:
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_2
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_1
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_0
c  in DIMACS:
-16709  16710 -16711 -48 -16712 0
-16709  16710 -16711 -48 -16713 0
-16709  16710 -16711 -48 -16714 0

c  0+1 --> 1
c    (-b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧  p_48) -> (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0)
c  in CNF:
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_2
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_1
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨  b^{48, 2}_0
c  in DIMACS:
 16709  16710  16711 -48 -16712 0
 16709  16710  16711 -48 -16713 0
 16709  16710  16711 -48  16714 0

c  1+1 --> 2
c    (-b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧  b^{48, 1}_0 ∧  p_48) -> (-b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0)
c  in CNF:
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_2
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨  b^{48, 2}_1
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ -p_48 ∨ -b^{48, 2}_0
c  in DIMACS:
 16709  16710 -16711 -48 -16712 0
 16709  16710 -16711 -48  16713 0
 16709  16710 -16711 -48 -16714 0

c  2+1 --> break 
c    (-b^{48, 1}_2 ∧  b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧  p_48) -> break
c  in CNF:
c     b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ -p_48 ∨ break
c  in DIMACS:
 16709 -16710  16711 -48 1162 0


c  2-1 --> 1
c    (-b^{48, 1}_2 ∧  b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧ -p_48) -> (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0)
c  in CNF:
c     b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_2
c     b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_1
c     b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨  b^{48, 2}_0
c  in DIMACS:
 16709 -16710  16711  48 -16712 0
 16709 -16710  16711  48 -16713 0
 16709 -16710  16711  48  16714 0

c  1-1 --> 0
c    (-b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧  b^{48, 1}_0 ∧ -p_48) -> (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧ -b^{48, 2}_0)
c  in CNF:
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_2
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_1
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_0
c  in DIMACS:
 16709  16710 -16711  48 -16712 0
 16709  16710 -16711  48 -16713 0
 16709  16710 -16711  48 -16714 0

c  0-1 --> -1
c    (-b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧ -p_48) -> ( b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0)
c  in CNF:
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨  b^{48, 2}_2
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_1
c     b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨  b^{48, 2}_0
c  in DIMACS:
 16709  16710  16711  48  16712 0
 16709  16710  16711  48 -16713 0
 16709  16710  16711  48  16714 0

c  -1-1 --> -2
c    ( b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧  b^{48, 1}_0 ∧ -p_48) -> ( b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0)
c  in CNF:
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨  b^{48, 2}_2
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨  b^{48, 2}_1
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨  p_48 ∨ -b^{48, 2}_0
c  in DIMACS:
-16709  16710 -16711  48  16712 0
-16709  16710 -16711  48  16713 0
-16709  16710 -16711  48 -16714 0

c  -2-1 --> break 
c    ( b^{48, 1}_2 ∧  b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧ -p_48) -> break
c  in CNF:
c    -b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨  b^{48, 1}_0 ∨  p_48 ∨ break
c  in DIMACS:
-16709 -16710  16711  48 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 1}_2 ∧ -b^{48, 1}_1 ∧ -b^{48, 1}_0 ∧ true) 
c  in CNF:
c    -b^{48, 1}_2 ∨  b^{48, 1}_1 ∨  b^{48, 1}_0 ∨ false 
c  in DIMACS:
-16709  16710  16711  0

c  3 does not represent an automaton state.
c    -(-b^{48, 1}_2 ∧  b^{48, 1}_1 ∧  b^{48, 1}_0 ∧ true) 
c  in CNF:
c     b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ false 
c  in DIMACS:
 16709 -16710 -16711  0
c  -3 does not represent an automaton state.
c    -( b^{48, 1}_2 ∧  b^{48, 1}_1 ∧  b^{48, 1}_0 ∧ true) 
c  in CNF:
c    -b^{48, 1}_2 ∨ -b^{48, 1}_1 ∨ -b^{48, 1}_0 ∨ false 
c  in DIMACS:
-16709 -16710 -16711  0

c i = 2
c  -2+1 --> -1
c    ( b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧  p_96) -> ( b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0)
c  in CNF:
c    -b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨  b^{48, 3}_2
c    -b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_1
c    -b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨  b^{48, 3}_0
c  in DIMACS:
-16712 -16713  16714 -96  16715 0
-16712 -16713  16714 -96 -16716 0
-16712 -16713  16714 -96  16717 0

c  -1+1 --> 0
c    ( b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0 ∧  p_96) -> (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧ -b^{48, 3}_0)
c  in CNF:
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_2
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_1
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_0
c  in DIMACS:
-16712  16713 -16714 -96 -16715 0
-16712  16713 -16714 -96 -16716 0
-16712  16713 -16714 -96 -16717 0

c  0+1 --> 1
c    (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧  p_96) -> (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0)
c  in CNF:
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_2
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_1
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨  b^{48, 3}_0
c  in DIMACS:
 16712  16713  16714 -96 -16715 0
 16712  16713  16714 -96 -16716 0
 16712  16713  16714 -96  16717 0

c  1+1 --> 2
c    (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0 ∧  p_96) -> (-b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0)
c  in CNF:
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_2
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨  b^{48, 3}_1
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ -p_96 ∨ -b^{48, 3}_0
c  in DIMACS:
 16712  16713 -16714 -96 -16715 0
 16712  16713 -16714 -96  16716 0
 16712  16713 -16714 -96 -16717 0

c  2+1 --> break 
c    (-b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧  p_96) -> break
c  in CNF:
c     b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 16712 -16713  16714 -96 1162 0


c  2-1 --> 1
c    (-b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧ -p_96) -> (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0)
c  in CNF:
c     b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_2
c     b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_1
c     b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨  b^{48, 3}_0
c  in DIMACS:
 16712 -16713  16714  96 -16715 0
 16712 -16713  16714  96 -16716 0
 16712 -16713  16714  96  16717 0

c  1-1 --> 0
c    (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0 ∧ -p_96) -> (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧ -b^{48, 3}_0)
c  in CNF:
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_2
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_1
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_0
c  in DIMACS:
 16712  16713 -16714  96 -16715 0
 16712  16713 -16714  96 -16716 0
 16712  16713 -16714  96 -16717 0

c  0-1 --> -1
c    (-b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧ -p_96) -> ( b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0)
c  in CNF:
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨  b^{48, 3}_2
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_1
c     b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨  b^{48, 3}_0
c  in DIMACS:
 16712  16713  16714  96  16715 0
 16712  16713  16714  96 -16716 0
 16712  16713  16714  96  16717 0

c  -1-1 --> -2
c    ( b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧  b^{48, 2}_0 ∧ -p_96) -> ( b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0)
c  in CNF:
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨  b^{48, 3}_2
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨  b^{48, 3}_1
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨  p_96 ∨ -b^{48, 3}_0
c  in DIMACS:
-16712  16713 -16714  96  16715 0
-16712  16713 -16714  96  16716 0
-16712  16713 -16714  96 -16717 0

c  -2-1 --> break 
c    ( b^{48, 2}_2 ∧  b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨  b^{48, 2}_0 ∨  p_96 ∨ break
c  in DIMACS:
-16712 -16713  16714  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 2}_2 ∧ -b^{48, 2}_1 ∧ -b^{48, 2}_0 ∧ true) 
c  in CNF:
c    -b^{48, 2}_2 ∨  b^{48, 2}_1 ∨  b^{48, 2}_0 ∨ false 
c  in DIMACS:
-16712  16713  16714  0

c  3 does not represent an automaton state.
c    -(-b^{48, 2}_2 ∧  b^{48, 2}_1 ∧  b^{48, 2}_0 ∧ true) 
c  in CNF:
c     b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ false 
c  in DIMACS:
 16712 -16713 -16714  0
c  -3 does not represent an automaton state.
c    -( b^{48, 2}_2 ∧  b^{48, 2}_1 ∧  b^{48, 2}_0 ∧ true) 
c  in CNF:
c    -b^{48, 2}_2 ∨ -b^{48, 2}_1 ∨ -b^{48, 2}_0 ∨ false 
c  in DIMACS:
-16712 -16713 -16714  0

c i = 3
c  -2+1 --> -1
c    ( b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧  p_144) -> ( b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0)
c  in CNF:
c    -b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨  b^{48, 4}_2
c    -b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_1
c    -b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨  b^{48, 4}_0
c  in DIMACS:
-16715 -16716  16717 -144  16718 0
-16715 -16716  16717 -144 -16719 0
-16715 -16716  16717 -144  16720 0

c  -1+1 --> 0
c    ( b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0 ∧  p_144) -> (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧ -b^{48, 4}_0)
c  in CNF:
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_2
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_1
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_0
c  in DIMACS:
-16715  16716 -16717 -144 -16718 0
-16715  16716 -16717 -144 -16719 0
-16715  16716 -16717 -144 -16720 0

c  0+1 --> 1
c    (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧  p_144) -> (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0)
c  in CNF:
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_2
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_1
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨  b^{48, 4}_0
c  in DIMACS:
 16715  16716  16717 -144 -16718 0
 16715  16716  16717 -144 -16719 0
 16715  16716  16717 -144  16720 0

c  1+1 --> 2
c    (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0 ∧  p_144) -> (-b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0)
c  in CNF:
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_2
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨  b^{48, 4}_1
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ -p_144 ∨ -b^{48, 4}_0
c  in DIMACS:
 16715  16716 -16717 -144 -16718 0
 16715  16716 -16717 -144  16719 0
 16715  16716 -16717 -144 -16720 0

c  2+1 --> break 
c    (-b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧  p_144) -> break
c  in CNF:
c     b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 16715 -16716  16717 -144 1162 0


c  2-1 --> 1
c    (-b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧ -p_144) -> (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0)
c  in CNF:
c     b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_2
c     b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_1
c     b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨  b^{48, 4}_0
c  in DIMACS:
 16715 -16716  16717  144 -16718 0
 16715 -16716  16717  144 -16719 0
 16715 -16716  16717  144  16720 0

c  1-1 --> 0
c    (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0 ∧ -p_144) -> (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧ -b^{48, 4}_0)
c  in CNF:
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_2
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_1
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_0
c  in DIMACS:
 16715  16716 -16717  144 -16718 0
 16715  16716 -16717  144 -16719 0
 16715  16716 -16717  144 -16720 0

c  0-1 --> -1
c    (-b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧ -p_144) -> ( b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0)
c  in CNF:
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨  b^{48, 4}_2
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_1
c     b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨  b^{48, 4}_0
c  in DIMACS:
 16715  16716  16717  144  16718 0
 16715  16716  16717  144 -16719 0
 16715  16716  16717  144  16720 0

c  -1-1 --> -2
c    ( b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧  b^{48, 3}_0 ∧ -p_144) -> ( b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0)
c  in CNF:
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨  b^{48, 4}_2
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨  b^{48, 4}_1
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨  p_144 ∨ -b^{48, 4}_0
c  in DIMACS:
-16715  16716 -16717  144  16718 0
-16715  16716 -16717  144  16719 0
-16715  16716 -16717  144 -16720 0

c  -2-1 --> break 
c    ( b^{48, 3}_2 ∧  b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨  b^{48, 3}_0 ∨  p_144 ∨ break
c  in DIMACS:
-16715 -16716  16717  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 3}_2 ∧ -b^{48, 3}_1 ∧ -b^{48, 3}_0 ∧ true) 
c  in CNF:
c    -b^{48, 3}_2 ∨  b^{48, 3}_1 ∨  b^{48, 3}_0 ∨ false 
c  in DIMACS:
-16715  16716  16717  0

c  3 does not represent an automaton state.
c    -(-b^{48, 3}_2 ∧  b^{48, 3}_1 ∧  b^{48, 3}_0 ∧ true) 
c  in CNF:
c     b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ false 
c  in DIMACS:
 16715 -16716 -16717  0
c  -3 does not represent an automaton state.
c    -( b^{48, 3}_2 ∧  b^{48, 3}_1 ∧  b^{48, 3}_0 ∧ true) 
c  in CNF:
c    -b^{48, 3}_2 ∨ -b^{48, 3}_1 ∨ -b^{48, 3}_0 ∨ false 
c  in DIMACS:
-16715 -16716 -16717  0

c i = 4
c  -2+1 --> -1
c    ( b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧  p_192) -> ( b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0)
c  in CNF:
c    -b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨  b^{48, 5}_2
c    -b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_1
c    -b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨  b^{48, 5}_0
c  in DIMACS:
-16718 -16719  16720 -192  16721 0
-16718 -16719  16720 -192 -16722 0
-16718 -16719  16720 -192  16723 0

c  -1+1 --> 0
c    ( b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0 ∧  p_192) -> (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧ -b^{48, 5}_0)
c  in CNF:
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_2
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_1
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_0
c  in DIMACS:
-16718  16719 -16720 -192 -16721 0
-16718  16719 -16720 -192 -16722 0
-16718  16719 -16720 -192 -16723 0

c  0+1 --> 1
c    (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧  p_192) -> (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0)
c  in CNF:
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_2
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_1
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨  b^{48, 5}_0
c  in DIMACS:
 16718  16719  16720 -192 -16721 0
 16718  16719  16720 -192 -16722 0
 16718  16719  16720 -192  16723 0

c  1+1 --> 2
c    (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0 ∧  p_192) -> (-b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0)
c  in CNF:
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_2
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨  b^{48, 5}_1
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ -p_192 ∨ -b^{48, 5}_0
c  in DIMACS:
 16718  16719 -16720 -192 -16721 0
 16718  16719 -16720 -192  16722 0
 16718  16719 -16720 -192 -16723 0

c  2+1 --> break 
c    (-b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧  p_192) -> break
c  in CNF:
c     b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 16718 -16719  16720 -192 1162 0


c  2-1 --> 1
c    (-b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧ -p_192) -> (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0)
c  in CNF:
c     b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_2
c     b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_1
c     b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨  b^{48, 5}_0
c  in DIMACS:
 16718 -16719  16720  192 -16721 0
 16718 -16719  16720  192 -16722 0
 16718 -16719  16720  192  16723 0

c  1-1 --> 0
c    (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0 ∧ -p_192) -> (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧ -b^{48, 5}_0)
c  in CNF:
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_2
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_1
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_0
c  in DIMACS:
 16718  16719 -16720  192 -16721 0
 16718  16719 -16720  192 -16722 0
 16718  16719 -16720  192 -16723 0

c  0-1 --> -1
c    (-b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧ -p_192) -> ( b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0)
c  in CNF:
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨  b^{48, 5}_2
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_1
c     b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨  b^{48, 5}_0
c  in DIMACS:
 16718  16719  16720  192  16721 0
 16718  16719  16720  192 -16722 0
 16718  16719  16720  192  16723 0

c  -1-1 --> -2
c    ( b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧  b^{48, 4}_0 ∧ -p_192) -> ( b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0)
c  in CNF:
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨  b^{48, 5}_2
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨  b^{48, 5}_1
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨  p_192 ∨ -b^{48, 5}_0
c  in DIMACS:
-16718  16719 -16720  192  16721 0
-16718  16719 -16720  192  16722 0
-16718  16719 -16720  192 -16723 0

c  -2-1 --> break 
c    ( b^{48, 4}_2 ∧  b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨  b^{48, 4}_0 ∨  p_192 ∨ break
c  in DIMACS:
-16718 -16719  16720  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 4}_2 ∧ -b^{48, 4}_1 ∧ -b^{48, 4}_0 ∧ true) 
c  in CNF:
c    -b^{48, 4}_2 ∨  b^{48, 4}_1 ∨  b^{48, 4}_0 ∨ false 
c  in DIMACS:
-16718  16719  16720  0

c  3 does not represent an automaton state.
c    -(-b^{48, 4}_2 ∧  b^{48, 4}_1 ∧  b^{48, 4}_0 ∧ true) 
c  in CNF:
c     b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ false 
c  in DIMACS:
 16718 -16719 -16720  0
c  -3 does not represent an automaton state.
c    -( b^{48, 4}_2 ∧  b^{48, 4}_1 ∧  b^{48, 4}_0 ∧ true) 
c  in CNF:
c    -b^{48, 4}_2 ∨ -b^{48, 4}_1 ∨ -b^{48, 4}_0 ∨ false 
c  in DIMACS:
-16718 -16719 -16720  0

c i = 5
c  -2+1 --> -1
c    ( b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧  p_240) -> ( b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0)
c  in CNF:
c    -b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨  b^{48, 6}_2
c    -b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_1
c    -b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨  b^{48, 6}_0
c  in DIMACS:
-16721 -16722  16723 -240  16724 0
-16721 -16722  16723 -240 -16725 0
-16721 -16722  16723 -240  16726 0

c  -1+1 --> 0
c    ( b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0 ∧  p_240) -> (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧ -b^{48, 6}_0)
c  in CNF:
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_2
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_1
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_0
c  in DIMACS:
-16721  16722 -16723 -240 -16724 0
-16721  16722 -16723 -240 -16725 0
-16721  16722 -16723 -240 -16726 0

c  0+1 --> 1
c    (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧  p_240) -> (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0)
c  in CNF:
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_2
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_1
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨  b^{48, 6}_0
c  in DIMACS:
 16721  16722  16723 -240 -16724 0
 16721  16722  16723 -240 -16725 0
 16721  16722  16723 -240  16726 0

c  1+1 --> 2
c    (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0 ∧  p_240) -> (-b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0)
c  in CNF:
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_2
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨  b^{48, 6}_1
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ -p_240 ∨ -b^{48, 6}_0
c  in DIMACS:
 16721  16722 -16723 -240 -16724 0
 16721  16722 -16723 -240  16725 0
 16721  16722 -16723 -240 -16726 0

c  2+1 --> break 
c    (-b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧  p_240) -> break
c  in CNF:
c     b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 16721 -16722  16723 -240 1162 0


c  2-1 --> 1
c    (-b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧ -p_240) -> (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0)
c  in CNF:
c     b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_2
c     b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_1
c     b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨  b^{48, 6}_0
c  in DIMACS:
 16721 -16722  16723  240 -16724 0
 16721 -16722  16723  240 -16725 0
 16721 -16722  16723  240  16726 0

c  1-1 --> 0
c    (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0 ∧ -p_240) -> (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧ -b^{48, 6}_0)
c  in CNF:
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_2
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_1
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_0
c  in DIMACS:
 16721  16722 -16723  240 -16724 0
 16721  16722 -16723  240 -16725 0
 16721  16722 -16723  240 -16726 0

c  0-1 --> -1
c    (-b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧ -p_240) -> ( b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0)
c  in CNF:
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨  b^{48, 6}_2
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_1
c     b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨  b^{48, 6}_0
c  in DIMACS:
 16721  16722  16723  240  16724 0
 16721  16722  16723  240 -16725 0
 16721  16722  16723  240  16726 0

c  -1-1 --> -2
c    ( b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧  b^{48, 5}_0 ∧ -p_240) -> ( b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0)
c  in CNF:
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨  b^{48, 6}_2
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨  b^{48, 6}_1
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨  p_240 ∨ -b^{48, 6}_0
c  in DIMACS:
-16721  16722 -16723  240  16724 0
-16721  16722 -16723  240  16725 0
-16721  16722 -16723  240 -16726 0

c  -2-1 --> break 
c    ( b^{48, 5}_2 ∧  b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨  b^{48, 5}_0 ∨  p_240 ∨ break
c  in DIMACS:
-16721 -16722  16723  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 5}_2 ∧ -b^{48, 5}_1 ∧ -b^{48, 5}_0 ∧ true) 
c  in CNF:
c    -b^{48, 5}_2 ∨  b^{48, 5}_1 ∨  b^{48, 5}_0 ∨ false 
c  in DIMACS:
-16721  16722  16723  0

c  3 does not represent an automaton state.
c    -(-b^{48, 5}_2 ∧  b^{48, 5}_1 ∧  b^{48, 5}_0 ∧ true) 
c  in CNF:
c     b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ false 
c  in DIMACS:
 16721 -16722 -16723  0
c  -3 does not represent an automaton state.
c    -( b^{48, 5}_2 ∧  b^{48, 5}_1 ∧  b^{48, 5}_0 ∧ true) 
c  in CNF:
c    -b^{48, 5}_2 ∨ -b^{48, 5}_1 ∨ -b^{48, 5}_0 ∨ false 
c  in DIMACS:
-16721 -16722 -16723  0

c i = 6
c  -2+1 --> -1
c    ( b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧  p_288) -> ( b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0)
c  in CNF:
c    -b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨  b^{48, 7}_2
c    -b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_1
c    -b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨  b^{48, 7}_0
c  in DIMACS:
-16724 -16725  16726 -288  16727 0
-16724 -16725  16726 -288 -16728 0
-16724 -16725  16726 -288  16729 0

c  -1+1 --> 0
c    ( b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0 ∧  p_288) -> (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧ -b^{48, 7}_0)
c  in CNF:
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_2
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_1
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_0
c  in DIMACS:
-16724  16725 -16726 -288 -16727 0
-16724  16725 -16726 -288 -16728 0
-16724  16725 -16726 -288 -16729 0

c  0+1 --> 1
c    (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧  p_288) -> (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0)
c  in CNF:
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_2
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_1
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨  b^{48, 7}_0
c  in DIMACS:
 16724  16725  16726 -288 -16727 0
 16724  16725  16726 -288 -16728 0
 16724  16725  16726 -288  16729 0

c  1+1 --> 2
c    (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0 ∧  p_288) -> (-b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0)
c  in CNF:
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_2
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨  b^{48, 7}_1
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ -p_288 ∨ -b^{48, 7}_0
c  in DIMACS:
 16724  16725 -16726 -288 -16727 0
 16724  16725 -16726 -288  16728 0
 16724  16725 -16726 -288 -16729 0

c  2+1 --> break 
c    (-b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧  p_288) -> break
c  in CNF:
c     b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 16724 -16725  16726 -288 1162 0


c  2-1 --> 1
c    (-b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧ -p_288) -> (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0)
c  in CNF:
c     b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_2
c     b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_1
c     b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨  b^{48, 7}_0
c  in DIMACS:
 16724 -16725  16726  288 -16727 0
 16724 -16725  16726  288 -16728 0
 16724 -16725  16726  288  16729 0

c  1-1 --> 0
c    (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0 ∧ -p_288) -> (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧ -b^{48, 7}_0)
c  in CNF:
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_2
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_1
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_0
c  in DIMACS:
 16724  16725 -16726  288 -16727 0
 16724  16725 -16726  288 -16728 0
 16724  16725 -16726  288 -16729 0

c  0-1 --> -1
c    (-b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧ -p_288) -> ( b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0)
c  in CNF:
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨  b^{48, 7}_2
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_1
c     b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨  b^{48, 7}_0
c  in DIMACS:
 16724  16725  16726  288  16727 0
 16724  16725  16726  288 -16728 0
 16724  16725  16726  288  16729 0

c  -1-1 --> -2
c    ( b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧  b^{48, 6}_0 ∧ -p_288) -> ( b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0)
c  in CNF:
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨  b^{48, 7}_2
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨  b^{48, 7}_1
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨  p_288 ∨ -b^{48, 7}_0
c  in DIMACS:
-16724  16725 -16726  288  16727 0
-16724  16725 -16726  288  16728 0
-16724  16725 -16726  288 -16729 0

c  -2-1 --> break 
c    ( b^{48, 6}_2 ∧  b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨  b^{48, 6}_0 ∨  p_288 ∨ break
c  in DIMACS:
-16724 -16725  16726  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 6}_2 ∧ -b^{48, 6}_1 ∧ -b^{48, 6}_0 ∧ true) 
c  in CNF:
c    -b^{48, 6}_2 ∨  b^{48, 6}_1 ∨  b^{48, 6}_0 ∨ false 
c  in DIMACS:
-16724  16725  16726  0

c  3 does not represent an automaton state.
c    -(-b^{48, 6}_2 ∧  b^{48, 6}_1 ∧  b^{48, 6}_0 ∧ true) 
c  in CNF:
c     b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ false 
c  in DIMACS:
 16724 -16725 -16726  0
c  -3 does not represent an automaton state.
c    -( b^{48, 6}_2 ∧  b^{48, 6}_1 ∧  b^{48, 6}_0 ∧ true) 
c  in CNF:
c    -b^{48, 6}_2 ∨ -b^{48, 6}_1 ∨ -b^{48, 6}_0 ∨ false 
c  in DIMACS:
-16724 -16725 -16726  0

c i = 7
c  -2+1 --> -1
c    ( b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧  p_336) -> ( b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0)
c  in CNF:
c    -b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨  b^{48, 8}_2
c    -b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_1
c    -b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨  b^{48, 8}_0
c  in DIMACS:
-16727 -16728  16729 -336  16730 0
-16727 -16728  16729 -336 -16731 0
-16727 -16728  16729 -336  16732 0

c  -1+1 --> 0
c    ( b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0 ∧  p_336) -> (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧ -b^{48, 8}_0)
c  in CNF:
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_2
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_1
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_0
c  in DIMACS:
-16727  16728 -16729 -336 -16730 0
-16727  16728 -16729 -336 -16731 0
-16727  16728 -16729 -336 -16732 0

c  0+1 --> 1
c    (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧  p_336) -> (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0)
c  in CNF:
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_2
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_1
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨  b^{48, 8}_0
c  in DIMACS:
 16727  16728  16729 -336 -16730 0
 16727  16728  16729 -336 -16731 0
 16727  16728  16729 -336  16732 0

c  1+1 --> 2
c    (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0 ∧  p_336) -> (-b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0)
c  in CNF:
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_2
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨  b^{48, 8}_1
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ -p_336 ∨ -b^{48, 8}_0
c  in DIMACS:
 16727  16728 -16729 -336 -16730 0
 16727  16728 -16729 -336  16731 0
 16727  16728 -16729 -336 -16732 0

c  2+1 --> break 
c    (-b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧  p_336) -> break
c  in CNF:
c     b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 16727 -16728  16729 -336 1162 0


c  2-1 --> 1
c    (-b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧ -p_336) -> (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0)
c  in CNF:
c     b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_2
c     b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_1
c     b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨  b^{48, 8}_0
c  in DIMACS:
 16727 -16728  16729  336 -16730 0
 16727 -16728  16729  336 -16731 0
 16727 -16728  16729  336  16732 0

c  1-1 --> 0
c    (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0 ∧ -p_336) -> (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧ -b^{48, 8}_0)
c  in CNF:
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_2
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_1
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_0
c  in DIMACS:
 16727  16728 -16729  336 -16730 0
 16727  16728 -16729  336 -16731 0
 16727  16728 -16729  336 -16732 0

c  0-1 --> -1
c    (-b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧ -p_336) -> ( b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0)
c  in CNF:
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨  b^{48, 8}_2
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_1
c     b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨  b^{48, 8}_0
c  in DIMACS:
 16727  16728  16729  336  16730 0
 16727  16728  16729  336 -16731 0
 16727  16728  16729  336  16732 0

c  -1-1 --> -2
c    ( b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧  b^{48, 7}_0 ∧ -p_336) -> ( b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0)
c  in CNF:
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨  b^{48, 8}_2
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨  b^{48, 8}_1
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨  p_336 ∨ -b^{48, 8}_0
c  in DIMACS:
-16727  16728 -16729  336  16730 0
-16727  16728 -16729  336  16731 0
-16727  16728 -16729  336 -16732 0

c  -2-1 --> break 
c    ( b^{48, 7}_2 ∧  b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨  b^{48, 7}_0 ∨  p_336 ∨ break
c  in DIMACS:
-16727 -16728  16729  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 7}_2 ∧ -b^{48, 7}_1 ∧ -b^{48, 7}_0 ∧ true) 
c  in CNF:
c    -b^{48, 7}_2 ∨  b^{48, 7}_1 ∨  b^{48, 7}_0 ∨ false 
c  in DIMACS:
-16727  16728  16729  0

c  3 does not represent an automaton state.
c    -(-b^{48, 7}_2 ∧  b^{48, 7}_1 ∧  b^{48, 7}_0 ∧ true) 
c  in CNF:
c     b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ false 
c  in DIMACS:
 16727 -16728 -16729  0
c  -3 does not represent an automaton state.
c    -( b^{48, 7}_2 ∧  b^{48, 7}_1 ∧  b^{48, 7}_0 ∧ true) 
c  in CNF:
c    -b^{48, 7}_2 ∨ -b^{48, 7}_1 ∨ -b^{48, 7}_0 ∨ false 
c  in DIMACS:
-16727 -16728 -16729  0

c i = 8
c  -2+1 --> -1
c    ( b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧  p_384) -> ( b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0)
c  in CNF:
c    -b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨  b^{48, 9}_2
c    -b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_1
c    -b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨  b^{48, 9}_0
c  in DIMACS:
-16730 -16731  16732 -384  16733 0
-16730 -16731  16732 -384 -16734 0
-16730 -16731  16732 -384  16735 0

c  -1+1 --> 0
c    ( b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0 ∧  p_384) -> (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧ -b^{48, 9}_0)
c  in CNF:
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_2
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_1
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_0
c  in DIMACS:
-16730  16731 -16732 -384 -16733 0
-16730  16731 -16732 -384 -16734 0
-16730  16731 -16732 -384 -16735 0

c  0+1 --> 1
c    (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧  p_384) -> (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0)
c  in CNF:
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_2
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_1
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨  b^{48, 9}_0
c  in DIMACS:
 16730  16731  16732 -384 -16733 0
 16730  16731  16732 -384 -16734 0
 16730  16731  16732 -384  16735 0

c  1+1 --> 2
c    (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0 ∧  p_384) -> (-b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0)
c  in CNF:
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_2
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨  b^{48, 9}_1
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ -p_384 ∨ -b^{48, 9}_0
c  in DIMACS:
 16730  16731 -16732 -384 -16733 0
 16730  16731 -16732 -384  16734 0
 16730  16731 -16732 -384 -16735 0

c  2+1 --> break 
c    (-b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧  p_384) -> break
c  in CNF:
c     b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 16730 -16731  16732 -384 1162 0


c  2-1 --> 1
c    (-b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧ -p_384) -> (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0)
c  in CNF:
c     b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_2
c     b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_1
c     b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨  b^{48, 9}_0
c  in DIMACS:
 16730 -16731  16732  384 -16733 0
 16730 -16731  16732  384 -16734 0
 16730 -16731  16732  384  16735 0

c  1-1 --> 0
c    (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0 ∧ -p_384) -> (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧ -b^{48, 9}_0)
c  in CNF:
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_2
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_1
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_0
c  in DIMACS:
 16730  16731 -16732  384 -16733 0
 16730  16731 -16732  384 -16734 0
 16730  16731 -16732  384 -16735 0

c  0-1 --> -1
c    (-b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧ -p_384) -> ( b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0)
c  in CNF:
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨  b^{48, 9}_2
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_1
c     b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨  b^{48, 9}_0
c  in DIMACS:
 16730  16731  16732  384  16733 0
 16730  16731  16732  384 -16734 0
 16730  16731  16732  384  16735 0

c  -1-1 --> -2
c    ( b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧  b^{48, 8}_0 ∧ -p_384) -> ( b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0)
c  in CNF:
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨  b^{48, 9}_2
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨  b^{48, 9}_1
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨  p_384 ∨ -b^{48, 9}_0
c  in DIMACS:
-16730  16731 -16732  384  16733 0
-16730  16731 -16732  384  16734 0
-16730  16731 -16732  384 -16735 0

c  -2-1 --> break 
c    ( b^{48, 8}_2 ∧  b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨  b^{48, 8}_0 ∨  p_384 ∨ break
c  in DIMACS:
-16730 -16731  16732  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 8}_2 ∧ -b^{48, 8}_1 ∧ -b^{48, 8}_0 ∧ true) 
c  in CNF:
c    -b^{48, 8}_2 ∨  b^{48, 8}_1 ∨  b^{48, 8}_0 ∨ false 
c  in DIMACS:
-16730  16731  16732  0

c  3 does not represent an automaton state.
c    -(-b^{48, 8}_2 ∧  b^{48, 8}_1 ∧  b^{48, 8}_0 ∧ true) 
c  in CNF:
c     b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ false 
c  in DIMACS:
 16730 -16731 -16732  0
c  -3 does not represent an automaton state.
c    -( b^{48, 8}_2 ∧  b^{48, 8}_1 ∧  b^{48, 8}_0 ∧ true) 
c  in CNF:
c    -b^{48, 8}_2 ∨ -b^{48, 8}_1 ∨ -b^{48, 8}_0 ∨ false 
c  in DIMACS:
-16730 -16731 -16732  0

c i = 9
c  -2+1 --> -1
c    ( b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧  p_432) -> ( b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0)
c  in CNF:
c    -b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨  b^{48, 10}_2
c    -b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_1
c    -b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨  b^{48, 10}_0
c  in DIMACS:
-16733 -16734  16735 -432  16736 0
-16733 -16734  16735 -432 -16737 0
-16733 -16734  16735 -432  16738 0

c  -1+1 --> 0
c    ( b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0 ∧  p_432) -> (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧ -b^{48, 10}_0)
c  in CNF:
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_2
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_1
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_0
c  in DIMACS:
-16733  16734 -16735 -432 -16736 0
-16733  16734 -16735 -432 -16737 0
-16733  16734 -16735 -432 -16738 0

c  0+1 --> 1
c    (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧  p_432) -> (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0)
c  in CNF:
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_2
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_1
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨  b^{48, 10}_0
c  in DIMACS:
 16733  16734  16735 -432 -16736 0
 16733  16734  16735 -432 -16737 0
 16733  16734  16735 -432  16738 0

c  1+1 --> 2
c    (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0 ∧  p_432) -> (-b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0)
c  in CNF:
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_2
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨  b^{48, 10}_1
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ -p_432 ∨ -b^{48, 10}_0
c  in DIMACS:
 16733  16734 -16735 -432 -16736 0
 16733  16734 -16735 -432  16737 0
 16733  16734 -16735 -432 -16738 0

c  2+1 --> break 
c    (-b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧  p_432) -> break
c  in CNF:
c     b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 16733 -16734  16735 -432 1162 0


c  2-1 --> 1
c    (-b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧ -p_432) -> (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0)
c  in CNF:
c     b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_2
c     b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_1
c     b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨  b^{48, 10}_0
c  in DIMACS:
 16733 -16734  16735  432 -16736 0
 16733 -16734  16735  432 -16737 0
 16733 -16734  16735  432  16738 0

c  1-1 --> 0
c    (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0 ∧ -p_432) -> (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧ -b^{48, 10}_0)
c  in CNF:
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_2
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_1
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_0
c  in DIMACS:
 16733  16734 -16735  432 -16736 0
 16733  16734 -16735  432 -16737 0
 16733  16734 -16735  432 -16738 0

c  0-1 --> -1
c    (-b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧ -p_432) -> ( b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0)
c  in CNF:
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨  b^{48, 10}_2
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_1
c     b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨  b^{48, 10}_0
c  in DIMACS:
 16733  16734  16735  432  16736 0
 16733  16734  16735  432 -16737 0
 16733  16734  16735  432  16738 0

c  -1-1 --> -2
c    ( b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧  b^{48, 9}_0 ∧ -p_432) -> ( b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0)
c  in CNF:
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨  b^{48, 10}_2
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨  b^{48, 10}_1
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨  p_432 ∨ -b^{48, 10}_0
c  in DIMACS:
-16733  16734 -16735  432  16736 0
-16733  16734 -16735  432  16737 0
-16733  16734 -16735  432 -16738 0

c  -2-1 --> break 
c    ( b^{48, 9}_2 ∧  b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨  b^{48, 9}_0 ∨  p_432 ∨ break
c  in DIMACS:
-16733 -16734  16735  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 9}_2 ∧ -b^{48, 9}_1 ∧ -b^{48, 9}_0 ∧ true) 
c  in CNF:
c    -b^{48, 9}_2 ∨  b^{48, 9}_1 ∨  b^{48, 9}_0 ∨ false 
c  in DIMACS:
-16733  16734  16735  0

c  3 does not represent an automaton state.
c    -(-b^{48, 9}_2 ∧  b^{48, 9}_1 ∧  b^{48, 9}_0 ∧ true) 
c  in CNF:
c     b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ false 
c  in DIMACS:
 16733 -16734 -16735  0
c  -3 does not represent an automaton state.
c    -( b^{48, 9}_2 ∧  b^{48, 9}_1 ∧  b^{48, 9}_0 ∧ true) 
c  in CNF:
c    -b^{48, 9}_2 ∨ -b^{48, 9}_1 ∨ -b^{48, 9}_0 ∨ false 
c  in DIMACS:
-16733 -16734 -16735  0

c i = 10
c  -2+1 --> -1
c    ( b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧  p_480) -> ( b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0)
c  in CNF:
c    -b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨  b^{48, 11}_2
c    -b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_1
c    -b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨  b^{48, 11}_0
c  in DIMACS:
-16736 -16737  16738 -480  16739 0
-16736 -16737  16738 -480 -16740 0
-16736 -16737  16738 -480  16741 0

c  -1+1 --> 0
c    ( b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0 ∧  p_480) -> (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧ -b^{48, 11}_0)
c  in CNF:
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_2
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_1
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_0
c  in DIMACS:
-16736  16737 -16738 -480 -16739 0
-16736  16737 -16738 -480 -16740 0
-16736  16737 -16738 -480 -16741 0

c  0+1 --> 1
c    (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧  p_480) -> (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0)
c  in CNF:
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_2
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_1
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨  b^{48, 11}_0
c  in DIMACS:
 16736  16737  16738 -480 -16739 0
 16736  16737  16738 -480 -16740 0
 16736  16737  16738 -480  16741 0

c  1+1 --> 2
c    (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0 ∧  p_480) -> (-b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0)
c  in CNF:
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_2
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨  b^{48, 11}_1
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ -p_480 ∨ -b^{48, 11}_0
c  in DIMACS:
 16736  16737 -16738 -480 -16739 0
 16736  16737 -16738 -480  16740 0
 16736  16737 -16738 -480 -16741 0

c  2+1 --> break 
c    (-b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧  p_480) -> break
c  in CNF:
c     b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 16736 -16737  16738 -480 1162 0


c  2-1 --> 1
c    (-b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧ -p_480) -> (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0)
c  in CNF:
c     b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_2
c     b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_1
c     b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨  b^{48, 11}_0
c  in DIMACS:
 16736 -16737  16738  480 -16739 0
 16736 -16737  16738  480 -16740 0
 16736 -16737  16738  480  16741 0

c  1-1 --> 0
c    (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0 ∧ -p_480) -> (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧ -b^{48, 11}_0)
c  in CNF:
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_2
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_1
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_0
c  in DIMACS:
 16736  16737 -16738  480 -16739 0
 16736  16737 -16738  480 -16740 0
 16736  16737 -16738  480 -16741 0

c  0-1 --> -1
c    (-b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧ -p_480) -> ( b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0)
c  in CNF:
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨  b^{48, 11}_2
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_1
c     b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨  b^{48, 11}_0
c  in DIMACS:
 16736  16737  16738  480  16739 0
 16736  16737  16738  480 -16740 0
 16736  16737  16738  480  16741 0

c  -1-1 --> -2
c    ( b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧  b^{48, 10}_0 ∧ -p_480) -> ( b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0)
c  in CNF:
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨  b^{48, 11}_2
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨  b^{48, 11}_1
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨  p_480 ∨ -b^{48, 11}_0
c  in DIMACS:
-16736  16737 -16738  480  16739 0
-16736  16737 -16738  480  16740 0
-16736  16737 -16738  480 -16741 0

c  -2-1 --> break 
c    ( b^{48, 10}_2 ∧  b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨  b^{48, 10}_0 ∨  p_480 ∨ break
c  in DIMACS:
-16736 -16737  16738  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 10}_2 ∧ -b^{48, 10}_1 ∧ -b^{48, 10}_0 ∧ true) 
c  in CNF:
c    -b^{48, 10}_2 ∨  b^{48, 10}_1 ∨  b^{48, 10}_0 ∨ false 
c  in DIMACS:
-16736  16737  16738  0

c  3 does not represent an automaton state.
c    -(-b^{48, 10}_2 ∧  b^{48, 10}_1 ∧  b^{48, 10}_0 ∧ true) 
c  in CNF:
c     b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ false 
c  in DIMACS:
 16736 -16737 -16738  0
c  -3 does not represent an automaton state.
c    -( b^{48, 10}_2 ∧  b^{48, 10}_1 ∧  b^{48, 10}_0 ∧ true) 
c  in CNF:
c    -b^{48, 10}_2 ∨ -b^{48, 10}_1 ∨ -b^{48, 10}_0 ∨ false 
c  in DIMACS:
-16736 -16737 -16738  0

c i = 11
c  -2+1 --> -1
c    ( b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧  p_528) -> ( b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0)
c  in CNF:
c    -b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨  b^{48, 12}_2
c    -b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_1
c    -b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨  b^{48, 12}_0
c  in DIMACS:
-16739 -16740  16741 -528  16742 0
-16739 -16740  16741 -528 -16743 0
-16739 -16740  16741 -528  16744 0

c  -1+1 --> 0
c    ( b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0 ∧  p_528) -> (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧ -b^{48, 12}_0)
c  in CNF:
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_2
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_1
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_0
c  in DIMACS:
-16739  16740 -16741 -528 -16742 0
-16739  16740 -16741 -528 -16743 0
-16739  16740 -16741 -528 -16744 0

c  0+1 --> 1
c    (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧  p_528) -> (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0)
c  in CNF:
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_2
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_1
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨  b^{48, 12}_0
c  in DIMACS:
 16739  16740  16741 -528 -16742 0
 16739  16740  16741 -528 -16743 0
 16739  16740  16741 -528  16744 0

c  1+1 --> 2
c    (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0 ∧  p_528) -> (-b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0)
c  in CNF:
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_2
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨  b^{48, 12}_1
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ -p_528 ∨ -b^{48, 12}_0
c  in DIMACS:
 16739  16740 -16741 -528 -16742 0
 16739  16740 -16741 -528  16743 0
 16739  16740 -16741 -528 -16744 0

c  2+1 --> break 
c    (-b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧  p_528) -> break
c  in CNF:
c     b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 16739 -16740  16741 -528 1162 0


c  2-1 --> 1
c    (-b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧ -p_528) -> (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0)
c  in CNF:
c     b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_2
c     b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_1
c     b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨  b^{48, 12}_0
c  in DIMACS:
 16739 -16740  16741  528 -16742 0
 16739 -16740  16741  528 -16743 0
 16739 -16740  16741  528  16744 0

c  1-1 --> 0
c    (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0 ∧ -p_528) -> (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧ -b^{48, 12}_0)
c  in CNF:
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_2
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_1
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_0
c  in DIMACS:
 16739  16740 -16741  528 -16742 0
 16739  16740 -16741  528 -16743 0
 16739  16740 -16741  528 -16744 0

c  0-1 --> -1
c    (-b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧ -p_528) -> ( b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0)
c  in CNF:
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨  b^{48, 12}_2
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_1
c     b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨  b^{48, 12}_0
c  in DIMACS:
 16739  16740  16741  528  16742 0
 16739  16740  16741  528 -16743 0
 16739  16740  16741  528  16744 0

c  -1-1 --> -2
c    ( b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧  b^{48, 11}_0 ∧ -p_528) -> ( b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0)
c  in CNF:
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨  b^{48, 12}_2
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨  b^{48, 12}_1
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨  p_528 ∨ -b^{48, 12}_0
c  in DIMACS:
-16739  16740 -16741  528  16742 0
-16739  16740 -16741  528  16743 0
-16739  16740 -16741  528 -16744 0

c  -2-1 --> break 
c    ( b^{48, 11}_2 ∧  b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨  b^{48, 11}_0 ∨  p_528 ∨ break
c  in DIMACS:
-16739 -16740  16741  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 11}_2 ∧ -b^{48, 11}_1 ∧ -b^{48, 11}_0 ∧ true) 
c  in CNF:
c    -b^{48, 11}_2 ∨  b^{48, 11}_1 ∨  b^{48, 11}_0 ∨ false 
c  in DIMACS:
-16739  16740  16741  0

c  3 does not represent an automaton state.
c    -(-b^{48, 11}_2 ∧  b^{48, 11}_1 ∧  b^{48, 11}_0 ∧ true) 
c  in CNF:
c     b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ false 
c  in DIMACS:
 16739 -16740 -16741  0
c  -3 does not represent an automaton state.
c    -( b^{48, 11}_2 ∧  b^{48, 11}_1 ∧  b^{48, 11}_0 ∧ true) 
c  in CNF:
c    -b^{48, 11}_2 ∨ -b^{48, 11}_1 ∨ -b^{48, 11}_0 ∨ false 
c  in DIMACS:
-16739 -16740 -16741  0

c i = 12
c  -2+1 --> -1
c    ( b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧  p_576) -> ( b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0)
c  in CNF:
c    -b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨  b^{48, 13}_2
c    -b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_1
c    -b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨  b^{48, 13}_0
c  in DIMACS:
-16742 -16743  16744 -576  16745 0
-16742 -16743  16744 -576 -16746 0
-16742 -16743  16744 -576  16747 0

c  -1+1 --> 0
c    ( b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0 ∧  p_576) -> (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧ -b^{48, 13}_0)
c  in CNF:
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_2
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_1
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_0
c  in DIMACS:
-16742  16743 -16744 -576 -16745 0
-16742  16743 -16744 -576 -16746 0
-16742  16743 -16744 -576 -16747 0

c  0+1 --> 1
c    (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧  p_576) -> (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0)
c  in CNF:
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_2
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_1
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨  b^{48, 13}_0
c  in DIMACS:
 16742  16743  16744 -576 -16745 0
 16742  16743  16744 -576 -16746 0
 16742  16743  16744 -576  16747 0

c  1+1 --> 2
c    (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0 ∧  p_576) -> (-b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0)
c  in CNF:
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_2
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨  b^{48, 13}_1
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ -p_576 ∨ -b^{48, 13}_0
c  in DIMACS:
 16742  16743 -16744 -576 -16745 0
 16742  16743 -16744 -576  16746 0
 16742  16743 -16744 -576 -16747 0

c  2+1 --> break 
c    (-b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧  p_576) -> break
c  in CNF:
c     b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 16742 -16743  16744 -576 1162 0


c  2-1 --> 1
c    (-b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧ -p_576) -> (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0)
c  in CNF:
c     b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_2
c     b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_1
c     b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨  b^{48, 13}_0
c  in DIMACS:
 16742 -16743  16744  576 -16745 0
 16742 -16743  16744  576 -16746 0
 16742 -16743  16744  576  16747 0

c  1-1 --> 0
c    (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0 ∧ -p_576) -> (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧ -b^{48, 13}_0)
c  in CNF:
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_2
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_1
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_0
c  in DIMACS:
 16742  16743 -16744  576 -16745 0
 16742  16743 -16744  576 -16746 0
 16742  16743 -16744  576 -16747 0

c  0-1 --> -1
c    (-b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧ -p_576) -> ( b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0)
c  in CNF:
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨  b^{48, 13}_2
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_1
c     b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨  b^{48, 13}_0
c  in DIMACS:
 16742  16743  16744  576  16745 0
 16742  16743  16744  576 -16746 0
 16742  16743  16744  576  16747 0

c  -1-1 --> -2
c    ( b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧  b^{48, 12}_0 ∧ -p_576) -> ( b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0)
c  in CNF:
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨  b^{48, 13}_2
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨  b^{48, 13}_1
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨  p_576 ∨ -b^{48, 13}_0
c  in DIMACS:
-16742  16743 -16744  576  16745 0
-16742  16743 -16744  576  16746 0
-16742  16743 -16744  576 -16747 0

c  -2-1 --> break 
c    ( b^{48, 12}_2 ∧  b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨  b^{48, 12}_0 ∨  p_576 ∨ break
c  in DIMACS:
-16742 -16743  16744  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 12}_2 ∧ -b^{48, 12}_1 ∧ -b^{48, 12}_0 ∧ true) 
c  in CNF:
c    -b^{48, 12}_2 ∨  b^{48, 12}_1 ∨  b^{48, 12}_0 ∨ false 
c  in DIMACS:
-16742  16743  16744  0

c  3 does not represent an automaton state.
c    -(-b^{48, 12}_2 ∧  b^{48, 12}_1 ∧  b^{48, 12}_0 ∧ true) 
c  in CNF:
c     b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ false 
c  in DIMACS:
 16742 -16743 -16744  0
c  -3 does not represent an automaton state.
c    -( b^{48, 12}_2 ∧  b^{48, 12}_1 ∧  b^{48, 12}_0 ∧ true) 
c  in CNF:
c    -b^{48, 12}_2 ∨ -b^{48, 12}_1 ∨ -b^{48, 12}_0 ∨ false 
c  in DIMACS:
-16742 -16743 -16744  0

c i = 13
c  -2+1 --> -1
c    ( b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧  p_624) -> ( b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0)
c  in CNF:
c    -b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨  b^{48, 14}_2
c    -b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_1
c    -b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨  b^{48, 14}_0
c  in DIMACS:
-16745 -16746  16747 -624  16748 0
-16745 -16746  16747 -624 -16749 0
-16745 -16746  16747 -624  16750 0

c  -1+1 --> 0
c    ( b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0 ∧  p_624) -> (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧ -b^{48, 14}_0)
c  in CNF:
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_2
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_1
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_0
c  in DIMACS:
-16745  16746 -16747 -624 -16748 0
-16745  16746 -16747 -624 -16749 0
-16745  16746 -16747 -624 -16750 0

c  0+1 --> 1
c    (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧  p_624) -> (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0)
c  in CNF:
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_2
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_1
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨  b^{48, 14}_0
c  in DIMACS:
 16745  16746  16747 -624 -16748 0
 16745  16746  16747 -624 -16749 0
 16745  16746  16747 -624  16750 0

c  1+1 --> 2
c    (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0 ∧  p_624) -> (-b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0)
c  in CNF:
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_2
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨  b^{48, 14}_1
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ -p_624 ∨ -b^{48, 14}_0
c  in DIMACS:
 16745  16746 -16747 -624 -16748 0
 16745  16746 -16747 -624  16749 0
 16745  16746 -16747 -624 -16750 0

c  2+1 --> break 
c    (-b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧  p_624) -> break
c  in CNF:
c     b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 16745 -16746  16747 -624 1162 0


c  2-1 --> 1
c    (-b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧ -p_624) -> (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0)
c  in CNF:
c     b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_2
c     b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_1
c     b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨  b^{48, 14}_0
c  in DIMACS:
 16745 -16746  16747  624 -16748 0
 16745 -16746  16747  624 -16749 0
 16745 -16746  16747  624  16750 0

c  1-1 --> 0
c    (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0 ∧ -p_624) -> (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧ -b^{48, 14}_0)
c  in CNF:
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_2
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_1
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_0
c  in DIMACS:
 16745  16746 -16747  624 -16748 0
 16745  16746 -16747  624 -16749 0
 16745  16746 -16747  624 -16750 0

c  0-1 --> -1
c    (-b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧ -p_624) -> ( b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0)
c  in CNF:
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨  b^{48, 14}_2
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_1
c     b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨  b^{48, 14}_0
c  in DIMACS:
 16745  16746  16747  624  16748 0
 16745  16746  16747  624 -16749 0
 16745  16746  16747  624  16750 0

c  -1-1 --> -2
c    ( b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧  b^{48, 13}_0 ∧ -p_624) -> ( b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0)
c  in CNF:
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨  b^{48, 14}_2
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨  b^{48, 14}_1
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨  p_624 ∨ -b^{48, 14}_0
c  in DIMACS:
-16745  16746 -16747  624  16748 0
-16745  16746 -16747  624  16749 0
-16745  16746 -16747  624 -16750 0

c  -2-1 --> break 
c    ( b^{48, 13}_2 ∧  b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨  b^{48, 13}_0 ∨  p_624 ∨ break
c  in DIMACS:
-16745 -16746  16747  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 13}_2 ∧ -b^{48, 13}_1 ∧ -b^{48, 13}_0 ∧ true) 
c  in CNF:
c    -b^{48, 13}_2 ∨  b^{48, 13}_1 ∨  b^{48, 13}_0 ∨ false 
c  in DIMACS:
-16745  16746  16747  0

c  3 does not represent an automaton state.
c    -(-b^{48, 13}_2 ∧  b^{48, 13}_1 ∧  b^{48, 13}_0 ∧ true) 
c  in CNF:
c     b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ false 
c  in DIMACS:
 16745 -16746 -16747  0
c  -3 does not represent an automaton state.
c    -( b^{48, 13}_2 ∧  b^{48, 13}_1 ∧  b^{48, 13}_0 ∧ true) 
c  in CNF:
c    -b^{48, 13}_2 ∨ -b^{48, 13}_1 ∨ -b^{48, 13}_0 ∨ false 
c  in DIMACS:
-16745 -16746 -16747  0

c i = 14
c  -2+1 --> -1
c    ( b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧  p_672) -> ( b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0)
c  in CNF:
c    -b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨  b^{48, 15}_2
c    -b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_1
c    -b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨  b^{48, 15}_0
c  in DIMACS:
-16748 -16749  16750 -672  16751 0
-16748 -16749  16750 -672 -16752 0
-16748 -16749  16750 -672  16753 0

c  -1+1 --> 0
c    ( b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0 ∧  p_672) -> (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧ -b^{48, 15}_0)
c  in CNF:
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_2
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_1
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_0
c  in DIMACS:
-16748  16749 -16750 -672 -16751 0
-16748  16749 -16750 -672 -16752 0
-16748  16749 -16750 -672 -16753 0

c  0+1 --> 1
c    (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧  p_672) -> (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0)
c  in CNF:
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_2
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_1
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨  b^{48, 15}_0
c  in DIMACS:
 16748  16749  16750 -672 -16751 0
 16748  16749  16750 -672 -16752 0
 16748  16749  16750 -672  16753 0

c  1+1 --> 2
c    (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0 ∧  p_672) -> (-b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0)
c  in CNF:
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_2
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨  b^{48, 15}_1
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ -p_672 ∨ -b^{48, 15}_0
c  in DIMACS:
 16748  16749 -16750 -672 -16751 0
 16748  16749 -16750 -672  16752 0
 16748  16749 -16750 -672 -16753 0

c  2+1 --> break 
c    (-b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧  p_672) -> break
c  in CNF:
c     b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 16748 -16749  16750 -672 1162 0


c  2-1 --> 1
c    (-b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧ -p_672) -> (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0)
c  in CNF:
c     b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_2
c     b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_1
c     b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨  b^{48, 15}_0
c  in DIMACS:
 16748 -16749  16750  672 -16751 0
 16748 -16749  16750  672 -16752 0
 16748 -16749  16750  672  16753 0

c  1-1 --> 0
c    (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0 ∧ -p_672) -> (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧ -b^{48, 15}_0)
c  in CNF:
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_2
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_1
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_0
c  in DIMACS:
 16748  16749 -16750  672 -16751 0
 16748  16749 -16750  672 -16752 0
 16748  16749 -16750  672 -16753 0

c  0-1 --> -1
c    (-b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧ -p_672) -> ( b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0)
c  in CNF:
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨  b^{48, 15}_2
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_1
c     b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨  b^{48, 15}_0
c  in DIMACS:
 16748  16749  16750  672  16751 0
 16748  16749  16750  672 -16752 0
 16748  16749  16750  672  16753 0

c  -1-1 --> -2
c    ( b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧  b^{48, 14}_0 ∧ -p_672) -> ( b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0)
c  in CNF:
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨  b^{48, 15}_2
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨  b^{48, 15}_1
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨  p_672 ∨ -b^{48, 15}_0
c  in DIMACS:
-16748  16749 -16750  672  16751 0
-16748  16749 -16750  672  16752 0
-16748  16749 -16750  672 -16753 0

c  -2-1 --> break 
c    ( b^{48, 14}_2 ∧  b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨  b^{48, 14}_0 ∨  p_672 ∨ break
c  in DIMACS:
-16748 -16749  16750  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 14}_2 ∧ -b^{48, 14}_1 ∧ -b^{48, 14}_0 ∧ true) 
c  in CNF:
c    -b^{48, 14}_2 ∨  b^{48, 14}_1 ∨  b^{48, 14}_0 ∨ false 
c  in DIMACS:
-16748  16749  16750  0

c  3 does not represent an automaton state.
c    -(-b^{48, 14}_2 ∧  b^{48, 14}_1 ∧  b^{48, 14}_0 ∧ true) 
c  in CNF:
c     b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ false 
c  in DIMACS:
 16748 -16749 -16750  0
c  -3 does not represent an automaton state.
c    -( b^{48, 14}_2 ∧  b^{48, 14}_1 ∧  b^{48, 14}_0 ∧ true) 
c  in CNF:
c    -b^{48, 14}_2 ∨ -b^{48, 14}_1 ∨ -b^{48, 14}_0 ∨ false 
c  in DIMACS:
-16748 -16749 -16750  0

c i = 15
c  -2+1 --> -1
c    ( b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧  p_720) -> ( b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0)
c  in CNF:
c    -b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨  b^{48, 16}_2
c    -b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_1
c    -b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨  b^{48, 16}_0
c  in DIMACS:
-16751 -16752  16753 -720  16754 0
-16751 -16752  16753 -720 -16755 0
-16751 -16752  16753 -720  16756 0

c  -1+1 --> 0
c    ( b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0 ∧  p_720) -> (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧ -b^{48, 16}_0)
c  in CNF:
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_2
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_1
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_0
c  in DIMACS:
-16751  16752 -16753 -720 -16754 0
-16751  16752 -16753 -720 -16755 0
-16751  16752 -16753 -720 -16756 0

c  0+1 --> 1
c    (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧  p_720) -> (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0)
c  in CNF:
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_2
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_1
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨  b^{48, 16}_0
c  in DIMACS:
 16751  16752  16753 -720 -16754 0
 16751  16752  16753 -720 -16755 0
 16751  16752  16753 -720  16756 0

c  1+1 --> 2
c    (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0 ∧  p_720) -> (-b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0)
c  in CNF:
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_2
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨  b^{48, 16}_1
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ -p_720 ∨ -b^{48, 16}_0
c  in DIMACS:
 16751  16752 -16753 -720 -16754 0
 16751  16752 -16753 -720  16755 0
 16751  16752 -16753 -720 -16756 0

c  2+1 --> break 
c    (-b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧  p_720) -> break
c  in CNF:
c     b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 16751 -16752  16753 -720 1162 0


c  2-1 --> 1
c    (-b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧ -p_720) -> (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0)
c  in CNF:
c     b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_2
c     b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_1
c     b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨  b^{48, 16}_0
c  in DIMACS:
 16751 -16752  16753  720 -16754 0
 16751 -16752  16753  720 -16755 0
 16751 -16752  16753  720  16756 0

c  1-1 --> 0
c    (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0 ∧ -p_720) -> (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧ -b^{48, 16}_0)
c  in CNF:
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_2
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_1
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_0
c  in DIMACS:
 16751  16752 -16753  720 -16754 0
 16751  16752 -16753  720 -16755 0
 16751  16752 -16753  720 -16756 0

c  0-1 --> -1
c    (-b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧ -p_720) -> ( b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0)
c  in CNF:
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨  b^{48, 16}_2
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_1
c     b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨  b^{48, 16}_0
c  in DIMACS:
 16751  16752  16753  720  16754 0
 16751  16752  16753  720 -16755 0
 16751  16752  16753  720  16756 0

c  -1-1 --> -2
c    ( b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧  b^{48, 15}_0 ∧ -p_720) -> ( b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0)
c  in CNF:
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨  b^{48, 16}_2
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨  b^{48, 16}_1
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨  p_720 ∨ -b^{48, 16}_0
c  in DIMACS:
-16751  16752 -16753  720  16754 0
-16751  16752 -16753  720  16755 0
-16751  16752 -16753  720 -16756 0

c  -2-1 --> break 
c    ( b^{48, 15}_2 ∧  b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨  b^{48, 15}_0 ∨  p_720 ∨ break
c  in DIMACS:
-16751 -16752  16753  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 15}_2 ∧ -b^{48, 15}_1 ∧ -b^{48, 15}_0 ∧ true) 
c  in CNF:
c    -b^{48, 15}_2 ∨  b^{48, 15}_1 ∨  b^{48, 15}_0 ∨ false 
c  in DIMACS:
-16751  16752  16753  0

c  3 does not represent an automaton state.
c    -(-b^{48, 15}_2 ∧  b^{48, 15}_1 ∧  b^{48, 15}_0 ∧ true) 
c  in CNF:
c     b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ false 
c  in DIMACS:
 16751 -16752 -16753  0
c  -3 does not represent an automaton state.
c    -( b^{48, 15}_2 ∧  b^{48, 15}_1 ∧  b^{48, 15}_0 ∧ true) 
c  in CNF:
c    -b^{48, 15}_2 ∨ -b^{48, 15}_1 ∨ -b^{48, 15}_0 ∨ false 
c  in DIMACS:
-16751 -16752 -16753  0

c i = 16
c  -2+1 --> -1
c    ( b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧  p_768) -> ( b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0)
c  in CNF:
c    -b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨  b^{48, 17}_2
c    -b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_1
c    -b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨  b^{48, 17}_0
c  in DIMACS:
-16754 -16755  16756 -768  16757 0
-16754 -16755  16756 -768 -16758 0
-16754 -16755  16756 -768  16759 0

c  -1+1 --> 0
c    ( b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0 ∧  p_768) -> (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧ -b^{48, 17}_0)
c  in CNF:
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_2
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_1
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_0
c  in DIMACS:
-16754  16755 -16756 -768 -16757 0
-16754  16755 -16756 -768 -16758 0
-16754  16755 -16756 -768 -16759 0

c  0+1 --> 1
c    (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧  p_768) -> (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0)
c  in CNF:
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_2
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_1
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨  b^{48, 17}_0
c  in DIMACS:
 16754  16755  16756 -768 -16757 0
 16754  16755  16756 -768 -16758 0
 16754  16755  16756 -768  16759 0

c  1+1 --> 2
c    (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0 ∧  p_768) -> (-b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0)
c  in CNF:
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_2
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨  b^{48, 17}_1
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ -p_768 ∨ -b^{48, 17}_0
c  in DIMACS:
 16754  16755 -16756 -768 -16757 0
 16754  16755 -16756 -768  16758 0
 16754  16755 -16756 -768 -16759 0

c  2+1 --> break 
c    (-b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧  p_768) -> break
c  in CNF:
c     b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 16754 -16755  16756 -768 1162 0


c  2-1 --> 1
c    (-b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧ -p_768) -> (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0)
c  in CNF:
c     b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_2
c     b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_1
c     b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨  b^{48, 17}_0
c  in DIMACS:
 16754 -16755  16756  768 -16757 0
 16754 -16755  16756  768 -16758 0
 16754 -16755  16756  768  16759 0

c  1-1 --> 0
c    (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0 ∧ -p_768) -> (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧ -b^{48, 17}_0)
c  in CNF:
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_2
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_1
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_0
c  in DIMACS:
 16754  16755 -16756  768 -16757 0
 16754  16755 -16756  768 -16758 0
 16754  16755 -16756  768 -16759 0

c  0-1 --> -1
c    (-b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧ -p_768) -> ( b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0)
c  in CNF:
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨  b^{48, 17}_2
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_1
c     b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨  b^{48, 17}_0
c  in DIMACS:
 16754  16755  16756  768  16757 0
 16754  16755  16756  768 -16758 0
 16754  16755  16756  768  16759 0

c  -1-1 --> -2
c    ( b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧  b^{48, 16}_0 ∧ -p_768) -> ( b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0)
c  in CNF:
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨  b^{48, 17}_2
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨  b^{48, 17}_1
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨  p_768 ∨ -b^{48, 17}_0
c  in DIMACS:
-16754  16755 -16756  768  16757 0
-16754  16755 -16756  768  16758 0
-16754  16755 -16756  768 -16759 0

c  -2-1 --> break 
c    ( b^{48, 16}_2 ∧  b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨  b^{48, 16}_0 ∨  p_768 ∨ break
c  in DIMACS:
-16754 -16755  16756  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 16}_2 ∧ -b^{48, 16}_1 ∧ -b^{48, 16}_0 ∧ true) 
c  in CNF:
c    -b^{48, 16}_2 ∨  b^{48, 16}_1 ∨  b^{48, 16}_0 ∨ false 
c  in DIMACS:
-16754  16755  16756  0

c  3 does not represent an automaton state.
c    -(-b^{48, 16}_2 ∧  b^{48, 16}_1 ∧  b^{48, 16}_0 ∧ true) 
c  in CNF:
c     b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ false 
c  in DIMACS:
 16754 -16755 -16756  0
c  -3 does not represent an automaton state.
c    -( b^{48, 16}_2 ∧  b^{48, 16}_1 ∧  b^{48, 16}_0 ∧ true) 
c  in CNF:
c    -b^{48, 16}_2 ∨ -b^{48, 16}_1 ∨ -b^{48, 16}_0 ∨ false 
c  in DIMACS:
-16754 -16755 -16756  0

c i = 17
c  -2+1 --> -1
c    ( b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧  p_816) -> ( b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0)
c  in CNF:
c    -b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨  b^{48, 18}_2
c    -b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_1
c    -b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨  b^{48, 18}_0
c  in DIMACS:
-16757 -16758  16759 -816  16760 0
-16757 -16758  16759 -816 -16761 0
-16757 -16758  16759 -816  16762 0

c  -1+1 --> 0
c    ( b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0 ∧  p_816) -> (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧ -b^{48, 18}_0)
c  in CNF:
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_2
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_1
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_0
c  in DIMACS:
-16757  16758 -16759 -816 -16760 0
-16757  16758 -16759 -816 -16761 0
-16757  16758 -16759 -816 -16762 0

c  0+1 --> 1
c    (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧  p_816) -> (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0)
c  in CNF:
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_2
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_1
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨  b^{48, 18}_0
c  in DIMACS:
 16757  16758  16759 -816 -16760 0
 16757  16758  16759 -816 -16761 0
 16757  16758  16759 -816  16762 0

c  1+1 --> 2
c    (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0 ∧  p_816) -> (-b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0)
c  in CNF:
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_2
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨  b^{48, 18}_1
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ -p_816 ∨ -b^{48, 18}_0
c  in DIMACS:
 16757  16758 -16759 -816 -16760 0
 16757  16758 -16759 -816  16761 0
 16757  16758 -16759 -816 -16762 0

c  2+1 --> break 
c    (-b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧  p_816) -> break
c  in CNF:
c     b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 16757 -16758  16759 -816 1162 0


c  2-1 --> 1
c    (-b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧ -p_816) -> (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0)
c  in CNF:
c     b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_2
c     b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_1
c     b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨  b^{48, 18}_0
c  in DIMACS:
 16757 -16758  16759  816 -16760 0
 16757 -16758  16759  816 -16761 0
 16757 -16758  16759  816  16762 0

c  1-1 --> 0
c    (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0 ∧ -p_816) -> (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧ -b^{48, 18}_0)
c  in CNF:
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_2
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_1
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_0
c  in DIMACS:
 16757  16758 -16759  816 -16760 0
 16757  16758 -16759  816 -16761 0
 16757  16758 -16759  816 -16762 0

c  0-1 --> -1
c    (-b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧ -p_816) -> ( b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0)
c  in CNF:
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨  b^{48, 18}_2
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_1
c     b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨  b^{48, 18}_0
c  in DIMACS:
 16757  16758  16759  816  16760 0
 16757  16758  16759  816 -16761 0
 16757  16758  16759  816  16762 0

c  -1-1 --> -2
c    ( b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧  b^{48, 17}_0 ∧ -p_816) -> ( b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0)
c  in CNF:
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨  b^{48, 18}_2
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨  b^{48, 18}_1
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨  p_816 ∨ -b^{48, 18}_0
c  in DIMACS:
-16757  16758 -16759  816  16760 0
-16757  16758 -16759  816  16761 0
-16757  16758 -16759  816 -16762 0

c  -2-1 --> break 
c    ( b^{48, 17}_2 ∧  b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨  b^{48, 17}_0 ∨  p_816 ∨ break
c  in DIMACS:
-16757 -16758  16759  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 17}_2 ∧ -b^{48, 17}_1 ∧ -b^{48, 17}_0 ∧ true) 
c  in CNF:
c    -b^{48, 17}_2 ∨  b^{48, 17}_1 ∨  b^{48, 17}_0 ∨ false 
c  in DIMACS:
-16757  16758  16759  0

c  3 does not represent an automaton state.
c    -(-b^{48, 17}_2 ∧  b^{48, 17}_1 ∧  b^{48, 17}_0 ∧ true) 
c  in CNF:
c     b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ false 
c  in DIMACS:
 16757 -16758 -16759  0
c  -3 does not represent an automaton state.
c    -( b^{48, 17}_2 ∧  b^{48, 17}_1 ∧  b^{48, 17}_0 ∧ true) 
c  in CNF:
c    -b^{48, 17}_2 ∨ -b^{48, 17}_1 ∨ -b^{48, 17}_0 ∨ false 
c  in DIMACS:
-16757 -16758 -16759  0

c i = 18
c  -2+1 --> -1
c    ( b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧  p_864) -> ( b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0)
c  in CNF:
c    -b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨  b^{48, 19}_2
c    -b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_1
c    -b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨  b^{48, 19}_0
c  in DIMACS:
-16760 -16761  16762 -864  16763 0
-16760 -16761  16762 -864 -16764 0
-16760 -16761  16762 -864  16765 0

c  -1+1 --> 0
c    ( b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0 ∧  p_864) -> (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧ -b^{48, 19}_0)
c  in CNF:
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_2
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_1
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_0
c  in DIMACS:
-16760  16761 -16762 -864 -16763 0
-16760  16761 -16762 -864 -16764 0
-16760  16761 -16762 -864 -16765 0

c  0+1 --> 1
c    (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧  p_864) -> (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0)
c  in CNF:
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_2
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_1
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨  b^{48, 19}_0
c  in DIMACS:
 16760  16761  16762 -864 -16763 0
 16760  16761  16762 -864 -16764 0
 16760  16761  16762 -864  16765 0

c  1+1 --> 2
c    (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0 ∧  p_864) -> (-b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0)
c  in CNF:
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_2
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨  b^{48, 19}_1
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ -p_864 ∨ -b^{48, 19}_0
c  in DIMACS:
 16760  16761 -16762 -864 -16763 0
 16760  16761 -16762 -864  16764 0
 16760  16761 -16762 -864 -16765 0

c  2+1 --> break 
c    (-b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧  p_864) -> break
c  in CNF:
c     b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 16760 -16761  16762 -864 1162 0


c  2-1 --> 1
c    (-b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧ -p_864) -> (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0)
c  in CNF:
c     b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_2
c     b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_1
c     b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨  b^{48, 19}_0
c  in DIMACS:
 16760 -16761  16762  864 -16763 0
 16760 -16761  16762  864 -16764 0
 16760 -16761  16762  864  16765 0

c  1-1 --> 0
c    (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0 ∧ -p_864) -> (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧ -b^{48, 19}_0)
c  in CNF:
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_2
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_1
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_0
c  in DIMACS:
 16760  16761 -16762  864 -16763 0
 16760  16761 -16762  864 -16764 0
 16760  16761 -16762  864 -16765 0

c  0-1 --> -1
c    (-b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧ -p_864) -> ( b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0)
c  in CNF:
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨  b^{48, 19}_2
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_1
c     b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨  b^{48, 19}_0
c  in DIMACS:
 16760  16761  16762  864  16763 0
 16760  16761  16762  864 -16764 0
 16760  16761  16762  864  16765 0

c  -1-1 --> -2
c    ( b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧  b^{48, 18}_0 ∧ -p_864) -> ( b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0)
c  in CNF:
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨  b^{48, 19}_2
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨  b^{48, 19}_1
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨  p_864 ∨ -b^{48, 19}_0
c  in DIMACS:
-16760  16761 -16762  864  16763 0
-16760  16761 -16762  864  16764 0
-16760  16761 -16762  864 -16765 0

c  -2-1 --> break 
c    ( b^{48, 18}_2 ∧  b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨  b^{48, 18}_0 ∨  p_864 ∨ break
c  in DIMACS:
-16760 -16761  16762  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 18}_2 ∧ -b^{48, 18}_1 ∧ -b^{48, 18}_0 ∧ true) 
c  in CNF:
c    -b^{48, 18}_2 ∨  b^{48, 18}_1 ∨  b^{48, 18}_0 ∨ false 
c  in DIMACS:
-16760  16761  16762  0

c  3 does not represent an automaton state.
c    -(-b^{48, 18}_2 ∧  b^{48, 18}_1 ∧  b^{48, 18}_0 ∧ true) 
c  in CNF:
c     b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ false 
c  in DIMACS:
 16760 -16761 -16762  0
c  -3 does not represent an automaton state.
c    -( b^{48, 18}_2 ∧  b^{48, 18}_1 ∧  b^{48, 18}_0 ∧ true) 
c  in CNF:
c    -b^{48, 18}_2 ∨ -b^{48, 18}_1 ∨ -b^{48, 18}_0 ∨ false 
c  in DIMACS:
-16760 -16761 -16762  0

c i = 19
c  -2+1 --> -1
c    ( b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧  p_912) -> ( b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0)
c  in CNF:
c    -b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨  b^{48, 20}_2
c    -b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_1
c    -b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨  b^{48, 20}_0
c  in DIMACS:
-16763 -16764  16765 -912  16766 0
-16763 -16764  16765 -912 -16767 0
-16763 -16764  16765 -912  16768 0

c  -1+1 --> 0
c    ( b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0 ∧  p_912) -> (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧ -b^{48, 20}_0)
c  in CNF:
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_2
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_1
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_0
c  in DIMACS:
-16763  16764 -16765 -912 -16766 0
-16763  16764 -16765 -912 -16767 0
-16763  16764 -16765 -912 -16768 0

c  0+1 --> 1
c    (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧  p_912) -> (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0)
c  in CNF:
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_2
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_1
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨  b^{48, 20}_0
c  in DIMACS:
 16763  16764  16765 -912 -16766 0
 16763  16764  16765 -912 -16767 0
 16763  16764  16765 -912  16768 0

c  1+1 --> 2
c    (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0 ∧  p_912) -> (-b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0)
c  in CNF:
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_2
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨  b^{48, 20}_1
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ -p_912 ∨ -b^{48, 20}_0
c  in DIMACS:
 16763  16764 -16765 -912 -16766 0
 16763  16764 -16765 -912  16767 0
 16763  16764 -16765 -912 -16768 0

c  2+1 --> break 
c    (-b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧  p_912) -> break
c  in CNF:
c     b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 16763 -16764  16765 -912 1162 0


c  2-1 --> 1
c    (-b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧ -p_912) -> (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0)
c  in CNF:
c     b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_2
c     b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_1
c     b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨  b^{48, 20}_0
c  in DIMACS:
 16763 -16764  16765  912 -16766 0
 16763 -16764  16765  912 -16767 0
 16763 -16764  16765  912  16768 0

c  1-1 --> 0
c    (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0 ∧ -p_912) -> (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧ -b^{48, 20}_0)
c  in CNF:
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_2
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_1
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_0
c  in DIMACS:
 16763  16764 -16765  912 -16766 0
 16763  16764 -16765  912 -16767 0
 16763  16764 -16765  912 -16768 0

c  0-1 --> -1
c    (-b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧ -p_912) -> ( b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0)
c  in CNF:
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨  b^{48, 20}_2
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_1
c     b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨  b^{48, 20}_0
c  in DIMACS:
 16763  16764  16765  912  16766 0
 16763  16764  16765  912 -16767 0
 16763  16764  16765  912  16768 0

c  -1-1 --> -2
c    ( b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧  b^{48, 19}_0 ∧ -p_912) -> ( b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0)
c  in CNF:
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨  b^{48, 20}_2
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨  b^{48, 20}_1
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨  p_912 ∨ -b^{48, 20}_0
c  in DIMACS:
-16763  16764 -16765  912  16766 0
-16763  16764 -16765  912  16767 0
-16763  16764 -16765  912 -16768 0

c  -2-1 --> break 
c    ( b^{48, 19}_2 ∧  b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨  b^{48, 19}_0 ∨  p_912 ∨ break
c  in DIMACS:
-16763 -16764  16765  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 19}_2 ∧ -b^{48, 19}_1 ∧ -b^{48, 19}_0 ∧ true) 
c  in CNF:
c    -b^{48, 19}_2 ∨  b^{48, 19}_1 ∨  b^{48, 19}_0 ∨ false 
c  in DIMACS:
-16763  16764  16765  0

c  3 does not represent an automaton state.
c    -(-b^{48, 19}_2 ∧  b^{48, 19}_1 ∧  b^{48, 19}_0 ∧ true) 
c  in CNF:
c     b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ false 
c  in DIMACS:
 16763 -16764 -16765  0
c  -3 does not represent an automaton state.
c    -( b^{48, 19}_2 ∧  b^{48, 19}_1 ∧  b^{48, 19}_0 ∧ true) 
c  in CNF:
c    -b^{48, 19}_2 ∨ -b^{48, 19}_1 ∨ -b^{48, 19}_0 ∨ false 
c  in DIMACS:
-16763 -16764 -16765  0

c i = 20
c  -2+1 --> -1
c    ( b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧  p_960) -> ( b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0)
c  in CNF:
c    -b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨  b^{48, 21}_2
c    -b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_1
c    -b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨  b^{48, 21}_0
c  in DIMACS:
-16766 -16767  16768 -960  16769 0
-16766 -16767  16768 -960 -16770 0
-16766 -16767  16768 -960  16771 0

c  -1+1 --> 0
c    ( b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0 ∧  p_960) -> (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧ -b^{48, 21}_0)
c  in CNF:
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_2
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_1
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_0
c  in DIMACS:
-16766  16767 -16768 -960 -16769 0
-16766  16767 -16768 -960 -16770 0
-16766  16767 -16768 -960 -16771 0

c  0+1 --> 1
c    (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧  p_960) -> (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0)
c  in CNF:
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_2
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_1
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨  b^{48, 21}_0
c  in DIMACS:
 16766  16767  16768 -960 -16769 0
 16766  16767  16768 -960 -16770 0
 16766  16767  16768 -960  16771 0

c  1+1 --> 2
c    (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0 ∧  p_960) -> (-b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0)
c  in CNF:
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_2
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨  b^{48, 21}_1
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ -p_960 ∨ -b^{48, 21}_0
c  in DIMACS:
 16766  16767 -16768 -960 -16769 0
 16766  16767 -16768 -960  16770 0
 16766  16767 -16768 -960 -16771 0

c  2+1 --> break 
c    (-b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧  p_960) -> break
c  in CNF:
c     b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 16766 -16767  16768 -960 1162 0


c  2-1 --> 1
c    (-b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧ -p_960) -> (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0)
c  in CNF:
c     b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_2
c     b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_1
c     b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨  b^{48, 21}_0
c  in DIMACS:
 16766 -16767  16768  960 -16769 0
 16766 -16767  16768  960 -16770 0
 16766 -16767  16768  960  16771 0

c  1-1 --> 0
c    (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0 ∧ -p_960) -> (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧ -b^{48, 21}_0)
c  in CNF:
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_2
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_1
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_0
c  in DIMACS:
 16766  16767 -16768  960 -16769 0
 16766  16767 -16768  960 -16770 0
 16766  16767 -16768  960 -16771 0

c  0-1 --> -1
c    (-b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧ -p_960) -> ( b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0)
c  in CNF:
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨  b^{48, 21}_2
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_1
c     b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨  b^{48, 21}_0
c  in DIMACS:
 16766  16767  16768  960  16769 0
 16766  16767  16768  960 -16770 0
 16766  16767  16768  960  16771 0

c  -1-1 --> -2
c    ( b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧  b^{48, 20}_0 ∧ -p_960) -> ( b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0)
c  in CNF:
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨  b^{48, 21}_2
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨  b^{48, 21}_1
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨  p_960 ∨ -b^{48, 21}_0
c  in DIMACS:
-16766  16767 -16768  960  16769 0
-16766  16767 -16768  960  16770 0
-16766  16767 -16768  960 -16771 0

c  -2-1 --> break 
c    ( b^{48, 20}_2 ∧  b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨  b^{48, 20}_0 ∨  p_960 ∨ break
c  in DIMACS:
-16766 -16767  16768  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 20}_2 ∧ -b^{48, 20}_1 ∧ -b^{48, 20}_0 ∧ true) 
c  in CNF:
c    -b^{48, 20}_2 ∨  b^{48, 20}_1 ∨  b^{48, 20}_0 ∨ false 
c  in DIMACS:
-16766  16767  16768  0

c  3 does not represent an automaton state.
c    -(-b^{48, 20}_2 ∧  b^{48, 20}_1 ∧  b^{48, 20}_0 ∧ true) 
c  in CNF:
c     b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ false 
c  in DIMACS:
 16766 -16767 -16768  0
c  -3 does not represent an automaton state.
c    -( b^{48, 20}_2 ∧  b^{48, 20}_1 ∧  b^{48, 20}_0 ∧ true) 
c  in CNF:
c    -b^{48, 20}_2 ∨ -b^{48, 20}_1 ∨ -b^{48, 20}_0 ∨ false 
c  in DIMACS:
-16766 -16767 -16768  0

c i = 21
c  -2+1 --> -1
c    ( b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧  p_1008) -> ( b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0)
c  in CNF:
c    -b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨  b^{48, 22}_2
c    -b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_1
c    -b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨  b^{48, 22}_0
c  in DIMACS:
-16769 -16770  16771 -1008  16772 0
-16769 -16770  16771 -1008 -16773 0
-16769 -16770  16771 -1008  16774 0

c  -1+1 --> 0
c    ( b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0 ∧  p_1008) -> (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧ -b^{48, 22}_0)
c  in CNF:
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_2
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_1
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_0
c  in DIMACS:
-16769  16770 -16771 -1008 -16772 0
-16769  16770 -16771 -1008 -16773 0
-16769  16770 -16771 -1008 -16774 0

c  0+1 --> 1
c    (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧  p_1008) -> (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0)
c  in CNF:
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_2
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_1
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨  b^{48, 22}_0
c  in DIMACS:
 16769  16770  16771 -1008 -16772 0
 16769  16770  16771 -1008 -16773 0
 16769  16770  16771 -1008  16774 0

c  1+1 --> 2
c    (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0 ∧  p_1008) -> (-b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0)
c  in CNF:
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_2
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨  b^{48, 22}_1
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ -p_1008 ∨ -b^{48, 22}_0
c  in DIMACS:
 16769  16770 -16771 -1008 -16772 0
 16769  16770 -16771 -1008  16773 0
 16769  16770 -16771 -1008 -16774 0

c  2+1 --> break 
c    (-b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 16769 -16770  16771 -1008 1162 0


c  2-1 --> 1
c    (-b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧ -p_1008) -> (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0)
c  in CNF:
c     b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_2
c     b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_1
c     b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨  b^{48, 22}_0
c  in DIMACS:
 16769 -16770  16771  1008 -16772 0
 16769 -16770  16771  1008 -16773 0
 16769 -16770  16771  1008  16774 0

c  1-1 --> 0
c    (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0 ∧ -p_1008) -> (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧ -b^{48, 22}_0)
c  in CNF:
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_2
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_1
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_0
c  in DIMACS:
 16769  16770 -16771  1008 -16772 0
 16769  16770 -16771  1008 -16773 0
 16769  16770 -16771  1008 -16774 0

c  0-1 --> -1
c    (-b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧ -p_1008) -> ( b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0)
c  in CNF:
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨  b^{48, 22}_2
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_1
c     b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨  b^{48, 22}_0
c  in DIMACS:
 16769  16770  16771  1008  16772 0
 16769  16770  16771  1008 -16773 0
 16769  16770  16771  1008  16774 0

c  -1-1 --> -2
c    ( b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧  b^{48, 21}_0 ∧ -p_1008) -> ( b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0)
c  in CNF:
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨  b^{48, 22}_2
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨  b^{48, 22}_1
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨  p_1008 ∨ -b^{48, 22}_0
c  in DIMACS:
-16769  16770 -16771  1008  16772 0
-16769  16770 -16771  1008  16773 0
-16769  16770 -16771  1008 -16774 0

c  -2-1 --> break 
c    ( b^{48, 21}_2 ∧  b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨  b^{48, 21}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-16769 -16770  16771  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 21}_2 ∧ -b^{48, 21}_1 ∧ -b^{48, 21}_0 ∧ true) 
c  in CNF:
c    -b^{48, 21}_2 ∨  b^{48, 21}_1 ∨  b^{48, 21}_0 ∨ false 
c  in DIMACS:
-16769  16770  16771  0

c  3 does not represent an automaton state.
c    -(-b^{48, 21}_2 ∧  b^{48, 21}_1 ∧  b^{48, 21}_0 ∧ true) 
c  in CNF:
c     b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ false 
c  in DIMACS:
 16769 -16770 -16771  0
c  -3 does not represent an automaton state.
c    -( b^{48, 21}_2 ∧  b^{48, 21}_1 ∧  b^{48, 21}_0 ∧ true) 
c  in CNF:
c    -b^{48, 21}_2 ∨ -b^{48, 21}_1 ∨ -b^{48, 21}_0 ∨ false 
c  in DIMACS:
-16769 -16770 -16771  0

c i = 22
c  -2+1 --> -1
c    ( b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧  p_1056) -> ( b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0)
c  in CNF:
c    -b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨  b^{48, 23}_2
c    -b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_1
c    -b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨  b^{48, 23}_0
c  in DIMACS:
-16772 -16773  16774 -1056  16775 0
-16772 -16773  16774 -1056 -16776 0
-16772 -16773  16774 -1056  16777 0

c  -1+1 --> 0
c    ( b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0 ∧  p_1056) -> (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧ -b^{48, 23}_0)
c  in CNF:
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_2
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_1
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_0
c  in DIMACS:
-16772  16773 -16774 -1056 -16775 0
-16772  16773 -16774 -1056 -16776 0
-16772  16773 -16774 -1056 -16777 0

c  0+1 --> 1
c    (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧  p_1056) -> (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0)
c  in CNF:
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_2
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_1
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨  b^{48, 23}_0
c  in DIMACS:
 16772  16773  16774 -1056 -16775 0
 16772  16773  16774 -1056 -16776 0
 16772  16773  16774 -1056  16777 0

c  1+1 --> 2
c    (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0 ∧  p_1056) -> (-b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0)
c  in CNF:
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_2
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨  b^{48, 23}_1
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ -p_1056 ∨ -b^{48, 23}_0
c  in DIMACS:
 16772  16773 -16774 -1056 -16775 0
 16772  16773 -16774 -1056  16776 0
 16772  16773 -16774 -1056 -16777 0

c  2+1 --> break 
c    (-b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 16772 -16773  16774 -1056 1162 0


c  2-1 --> 1
c    (-b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧ -p_1056) -> (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0)
c  in CNF:
c     b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_2
c     b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_1
c     b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨  b^{48, 23}_0
c  in DIMACS:
 16772 -16773  16774  1056 -16775 0
 16772 -16773  16774  1056 -16776 0
 16772 -16773  16774  1056  16777 0

c  1-1 --> 0
c    (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0 ∧ -p_1056) -> (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧ -b^{48, 23}_0)
c  in CNF:
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_2
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_1
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_0
c  in DIMACS:
 16772  16773 -16774  1056 -16775 0
 16772  16773 -16774  1056 -16776 0
 16772  16773 -16774  1056 -16777 0

c  0-1 --> -1
c    (-b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧ -p_1056) -> ( b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0)
c  in CNF:
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨  b^{48, 23}_2
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_1
c     b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨  b^{48, 23}_0
c  in DIMACS:
 16772  16773  16774  1056  16775 0
 16772  16773  16774  1056 -16776 0
 16772  16773  16774  1056  16777 0

c  -1-1 --> -2
c    ( b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧  b^{48, 22}_0 ∧ -p_1056) -> ( b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0)
c  in CNF:
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨  b^{48, 23}_2
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨  b^{48, 23}_1
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨  p_1056 ∨ -b^{48, 23}_0
c  in DIMACS:
-16772  16773 -16774  1056  16775 0
-16772  16773 -16774  1056  16776 0
-16772  16773 -16774  1056 -16777 0

c  -2-1 --> break 
c    ( b^{48, 22}_2 ∧  b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨  b^{48, 22}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-16772 -16773  16774  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 22}_2 ∧ -b^{48, 22}_1 ∧ -b^{48, 22}_0 ∧ true) 
c  in CNF:
c    -b^{48, 22}_2 ∨  b^{48, 22}_1 ∨  b^{48, 22}_0 ∨ false 
c  in DIMACS:
-16772  16773  16774  0

c  3 does not represent an automaton state.
c    -(-b^{48, 22}_2 ∧  b^{48, 22}_1 ∧  b^{48, 22}_0 ∧ true) 
c  in CNF:
c     b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ false 
c  in DIMACS:
 16772 -16773 -16774  0
c  -3 does not represent an automaton state.
c    -( b^{48, 22}_2 ∧  b^{48, 22}_1 ∧  b^{48, 22}_0 ∧ true) 
c  in CNF:
c    -b^{48, 22}_2 ∨ -b^{48, 22}_1 ∨ -b^{48, 22}_0 ∨ false 
c  in DIMACS:
-16772 -16773 -16774  0

c i = 23
c  -2+1 --> -1
c    ( b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧  p_1104) -> ( b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0)
c  in CNF:
c    -b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨  b^{48, 24}_2
c    -b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_1
c    -b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨  b^{48, 24}_0
c  in DIMACS:
-16775 -16776  16777 -1104  16778 0
-16775 -16776  16777 -1104 -16779 0
-16775 -16776  16777 -1104  16780 0

c  -1+1 --> 0
c    ( b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0 ∧  p_1104) -> (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧ -b^{48, 24}_0)
c  in CNF:
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_2
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_1
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_0
c  in DIMACS:
-16775  16776 -16777 -1104 -16778 0
-16775  16776 -16777 -1104 -16779 0
-16775  16776 -16777 -1104 -16780 0

c  0+1 --> 1
c    (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧  p_1104) -> (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0)
c  in CNF:
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_2
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_1
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨  b^{48, 24}_0
c  in DIMACS:
 16775  16776  16777 -1104 -16778 0
 16775  16776  16777 -1104 -16779 0
 16775  16776  16777 -1104  16780 0

c  1+1 --> 2
c    (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0 ∧  p_1104) -> (-b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0)
c  in CNF:
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_2
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨  b^{48, 24}_1
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ -p_1104 ∨ -b^{48, 24}_0
c  in DIMACS:
 16775  16776 -16777 -1104 -16778 0
 16775  16776 -16777 -1104  16779 0
 16775  16776 -16777 -1104 -16780 0

c  2+1 --> break 
c    (-b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 16775 -16776  16777 -1104 1162 0


c  2-1 --> 1
c    (-b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧ -p_1104) -> (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0)
c  in CNF:
c     b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_2
c     b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_1
c     b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨  b^{48, 24}_0
c  in DIMACS:
 16775 -16776  16777  1104 -16778 0
 16775 -16776  16777  1104 -16779 0
 16775 -16776  16777  1104  16780 0

c  1-1 --> 0
c    (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0 ∧ -p_1104) -> (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧ -b^{48, 24}_0)
c  in CNF:
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_2
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_1
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_0
c  in DIMACS:
 16775  16776 -16777  1104 -16778 0
 16775  16776 -16777  1104 -16779 0
 16775  16776 -16777  1104 -16780 0

c  0-1 --> -1
c    (-b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧ -p_1104) -> ( b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0)
c  in CNF:
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨  b^{48, 24}_2
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_1
c     b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨  b^{48, 24}_0
c  in DIMACS:
 16775  16776  16777  1104  16778 0
 16775  16776  16777  1104 -16779 0
 16775  16776  16777  1104  16780 0

c  -1-1 --> -2
c    ( b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧  b^{48, 23}_0 ∧ -p_1104) -> ( b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0)
c  in CNF:
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨  b^{48, 24}_2
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨  b^{48, 24}_1
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨  p_1104 ∨ -b^{48, 24}_0
c  in DIMACS:
-16775  16776 -16777  1104  16778 0
-16775  16776 -16777  1104  16779 0
-16775  16776 -16777  1104 -16780 0

c  -2-1 --> break 
c    ( b^{48, 23}_2 ∧  b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨  b^{48, 23}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-16775 -16776  16777  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 23}_2 ∧ -b^{48, 23}_1 ∧ -b^{48, 23}_0 ∧ true) 
c  in CNF:
c    -b^{48, 23}_2 ∨  b^{48, 23}_1 ∨  b^{48, 23}_0 ∨ false 
c  in DIMACS:
-16775  16776  16777  0

c  3 does not represent an automaton state.
c    -(-b^{48, 23}_2 ∧  b^{48, 23}_1 ∧  b^{48, 23}_0 ∧ true) 
c  in CNF:
c     b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ false 
c  in DIMACS:
 16775 -16776 -16777  0
c  -3 does not represent an automaton state.
c    -( b^{48, 23}_2 ∧  b^{48, 23}_1 ∧  b^{48, 23}_0 ∧ true) 
c  in CNF:
c    -b^{48, 23}_2 ∨ -b^{48, 23}_1 ∨ -b^{48, 23}_0 ∨ false 
c  in DIMACS:
-16775 -16776 -16777  0

c i = 24
c  -2+1 --> -1
c    ( b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧  p_1152) -> ( b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧  b^{48, 25}_0)
c  in CNF:
c    -b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨  b^{48, 25}_2
c    -b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_1
c    -b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨  b^{48, 25}_0
c  in DIMACS:
-16778 -16779  16780 -1152  16781 0
-16778 -16779  16780 -1152 -16782 0
-16778 -16779  16780 -1152  16783 0

c  -1+1 --> 0
c    ( b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0 ∧  p_1152) -> (-b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧ -b^{48, 25}_0)
c  in CNF:
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_2
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_1
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_0
c  in DIMACS:
-16778  16779 -16780 -1152 -16781 0
-16778  16779 -16780 -1152 -16782 0
-16778  16779 -16780 -1152 -16783 0

c  0+1 --> 1
c    (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧  p_1152) -> (-b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧  b^{48, 25}_0)
c  in CNF:
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_2
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_1
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨  b^{48, 25}_0
c  in DIMACS:
 16778  16779  16780 -1152 -16781 0
 16778  16779  16780 -1152 -16782 0
 16778  16779  16780 -1152  16783 0

c  1+1 --> 2
c    (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0 ∧  p_1152) -> (-b^{48, 25}_2 ∧  b^{48, 25}_1 ∧ -b^{48, 25}_0)
c  in CNF:
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_2
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨  b^{48, 25}_1
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ -p_1152 ∨ -b^{48, 25}_0
c  in DIMACS:
 16778  16779 -16780 -1152 -16781 0
 16778  16779 -16780 -1152  16782 0
 16778  16779 -16780 -1152 -16783 0

c  2+1 --> break 
c    (-b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 16778 -16779  16780 -1152 1162 0


c  2-1 --> 1
c    (-b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧ -p_1152) -> (-b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧  b^{48, 25}_0)
c  in CNF:
c     b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_2
c     b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_1
c     b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨  b^{48, 25}_0
c  in DIMACS:
 16778 -16779  16780  1152 -16781 0
 16778 -16779  16780  1152 -16782 0
 16778 -16779  16780  1152  16783 0

c  1-1 --> 0
c    (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0 ∧ -p_1152) -> (-b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧ -b^{48, 25}_0)
c  in CNF:
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_2
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_1
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_0
c  in DIMACS:
 16778  16779 -16780  1152 -16781 0
 16778  16779 -16780  1152 -16782 0
 16778  16779 -16780  1152 -16783 0

c  0-1 --> -1
c    (-b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧ -p_1152) -> ( b^{48, 25}_2 ∧ -b^{48, 25}_1 ∧  b^{48, 25}_0)
c  in CNF:
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨  b^{48, 25}_2
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_1
c     b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨  b^{48, 25}_0
c  in DIMACS:
 16778  16779  16780  1152  16781 0
 16778  16779  16780  1152 -16782 0
 16778  16779  16780  1152  16783 0

c  -1-1 --> -2
c    ( b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧  b^{48, 24}_0 ∧ -p_1152) -> ( b^{48, 25}_2 ∧  b^{48, 25}_1 ∧ -b^{48, 25}_0)
c  in CNF:
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨  b^{48, 25}_2
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨  b^{48, 25}_1
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨  p_1152 ∨ -b^{48, 25}_0
c  in DIMACS:
-16778  16779 -16780  1152  16781 0
-16778  16779 -16780  1152  16782 0
-16778  16779 -16780  1152 -16783 0

c  -2-1 --> break 
c    ( b^{48, 24}_2 ∧  b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨  b^{48, 24}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-16778 -16779  16780  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{48, 24}_2 ∧ -b^{48, 24}_1 ∧ -b^{48, 24}_0 ∧ true) 
c  in CNF:
c    -b^{48, 24}_2 ∨  b^{48, 24}_1 ∨  b^{48, 24}_0 ∨ false 
c  in DIMACS:
-16778  16779  16780  0

c  3 does not represent an automaton state.
c    -(-b^{48, 24}_2 ∧  b^{48, 24}_1 ∧  b^{48, 24}_0 ∧ true) 
c  in CNF:
c     b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ false 
c  in DIMACS:
 16778 -16779 -16780  0
c  -3 does not represent an automaton state.
c    -( b^{48, 24}_2 ∧  b^{48, 24}_1 ∧  b^{48, 24}_0 ∧ true) 
c  in CNF:
c    -b^{48, 24}_2 ∨ -b^{48, 24}_1 ∨ -b^{48, 24}_0 ∨ false 
c  in DIMACS:
-16778 -16779 -16780  0

c INIT for k = 49
c    -b^{49, 1}_2
c    -b^{49, 1}_1
c    -b^{49, 1}_0
c  in DIMACS:
-16784 0
-16785 0
-16786 0

c Transitions for k = 49
c i = 1
c  -2+1 --> -1
c    ( b^{49, 1}_2 ∧  b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧  p_49) -> ( b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0)
c  in CNF:
c    -b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨  b^{49, 2}_2
c    -b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_1
c    -b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨  b^{49, 2}_0
c  in DIMACS:
-16784 -16785  16786 -49  16787 0
-16784 -16785  16786 -49 -16788 0
-16784 -16785  16786 -49  16789 0

c  -1+1 --> 0
c    ( b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧  b^{49, 1}_0 ∧  p_49) -> (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧ -b^{49, 2}_0)
c  in CNF:
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_2
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_1
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_0
c  in DIMACS:
-16784  16785 -16786 -49 -16787 0
-16784  16785 -16786 -49 -16788 0
-16784  16785 -16786 -49 -16789 0

c  0+1 --> 1
c    (-b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧  p_49) -> (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0)
c  in CNF:
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_2
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_1
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨  b^{49, 2}_0
c  in DIMACS:
 16784  16785  16786 -49 -16787 0
 16784  16785  16786 -49 -16788 0
 16784  16785  16786 -49  16789 0

c  1+1 --> 2
c    (-b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧  b^{49, 1}_0 ∧  p_49) -> (-b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0)
c  in CNF:
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_2
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨  b^{49, 2}_1
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ -p_49 ∨ -b^{49, 2}_0
c  in DIMACS:
 16784  16785 -16786 -49 -16787 0
 16784  16785 -16786 -49  16788 0
 16784  16785 -16786 -49 -16789 0

c  2+1 --> break 
c    (-b^{49, 1}_2 ∧  b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧  p_49) -> break
c  in CNF:
c     b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ -p_49 ∨ break
c  in DIMACS:
 16784 -16785  16786 -49 1162 0


c  2-1 --> 1
c    (-b^{49, 1}_2 ∧  b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧ -p_49) -> (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0)
c  in CNF:
c     b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_2
c     b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_1
c     b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨  b^{49, 2}_0
c  in DIMACS:
 16784 -16785  16786  49 -16787 0
 16784 -16785  16786  49 -16788 0
 16784 -16785  16786  49  16789 0

c  1-1 --> 0
c    (-b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧  b^{49, 1}_0 ∧ -p_49) -> (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧ -b^{49, 2}_0)
c  in CNF:
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_2
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_1
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_0
c  in DIMACS:
 16784  16785 -16786  49 -16787 0
 16784  16785 -16786  49 -16788 0
 16784  16785 -16786  49 -16789 0

c  0-1 --> -1
c    (-b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧ -p_49) -> ( b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0)
c  in CNF:
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨  b^{49, 2}_2
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_1
c     b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨  b^{49, 2}_0
c  in DIMACS:
 16784  16785  16786  49  16787 0
 16784  16785  16786  49 -16788 0
 16784  16785  16786  49  16789 0

c  -1-1 --> -2
c    ( b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧  b^{49, 1}_0 ∧ -p_49) -> ( b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0)
c  in CNF:
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨  b^{49, 2}_2
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨  b^{49, 2}_1
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨  p_49 ∨ -b^{49, 2}_0
c  in DIMACS:
-16784  16785 -16786  49  16787 0
-16784  16785 -16786  49  16788 0
-16784  16785 -16786  49 -16789 0

c  -2-1 --> break 
c    ( b^{49, 1}_2 ∧  b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧ -p_49) -> break
c  in CNF:
c    -b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨  b^{49, 1}_0 ∨  p_49 ∨ break
c  in DIMACS:
-16784 -16785  16786  49 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 1}_2 ∧ -b^{49, 1}_1 ∧ -b^{49, 1}_0 ∧ true) 
c  in CNF:
c    -b^{49, 1}_2 ∨  b^{49, 1}_1 ∨  b^{49, 1}_0 ∨ false 
c  in DIMACS:
-16784  16785  16786  0

c  3 does not represent an automaton state.
c    -(-b^{49, 1}_2 ∧  b^{49, 1}_1 ∧  b^{49, 1}_0 ∧ true) 
c  in CNF:
c     b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ false 
c  in DIMACS:
 16784 -16785 -16786  0
c  -3 does not represent an automaton state.
c    -( b^{49, 1}_2 ∧  b^{49, 1}_1 ∧  b^{49, 1}_0 ∧ true) 
c  in CNF:
c    -b^{49, 1}_2 ∨ -b^{49, 1}_1 ∨ -b^{49, 1}_0 ∨ false 
c  in DIMACS:
-16784 -16785 -16786  0

c i = 2
c  -2+1 --> -1
c    ( b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧  p_98) -> ( b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0)
c  in CNF:
c    -b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨  b^{49, 3}_2
c    -b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_1
c    -b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨  b^{49, 3}_0
c  in DIMACS:
-16787 -16788  16789 -98  16790 0
-16787 -16788  16789 -98 -16791 0
-16787 -16788  16789 -98  16792 0

c  -1+1 --> 0
c    ( b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0 ∧  p_98) -> (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧ -b^{49, 3}_0)
c  in CNF:
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_2
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_1
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_0
c  in DIMACS:
-16787  16788 -16789 -98 -16790 0
-16787  16788 -16789 -98 -16791 0
-16787  16788 -16789 -98 -16792 0

c  0+1 --> 1
c    (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧  p_98) -> (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0)
c  in CNF:
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_2
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_1
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨  b^{49, 3}_0
c  in DIMACS:
 16787  16788  16789 -98 -16790 0
 16787  16788  16789 -98 -16791 0
 16787  16788  16789 -98  16792 0

c  1+1 --> 2
c    (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0 ∧  p_98) -> (-b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0)
c  in CNF:
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_2
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨  b^{49, 3}_1
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ -p_98 ∨ -b^{49, 3}_0
c  in DIMACS:
 16787  16788 -16789 -98 -16790 0
 16787  16788 -16789 -98  16791 0
 16787  16788 -16789 -98 -16792 0

c  2+1 --> break 
c    (-b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧  p_98) -> break
c  in CNF:
c     b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 16787 -16788  16789 -98 1162 0


c  2-1 --> 1
c    (-b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧ -p_98) -> (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0)
c  in CNF:
c     b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_2
c     b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_1
c     b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨  b^{49, 3}_0
c  in DIMACS:
 16787 -16788  16789  98 -16790 0
 16787 -16788  16789  98 -16791 0
 16787 -16788  16789  98  16792 0

c  1-1 --> 0
c    (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0 ∧ -p_98) -> (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧ -b^{49, 3}_0)
c  in CNF:
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_2
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_1
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_0
c  in DIMACS:
 16787  16788 -16789  98 -16790 0
 16787  16788 -16789  98 -16791 0
 16787  16788 -16789  98 -16792 0

c  0-1 --> -1
c    (-b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧ -p_98) -> ( b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0)
c  in CNF:
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨  b^{49, 3}_2
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_1
c     b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨  b^{49, 3}_0
c  in DIMACS:
 16787  16788  16789  98  16790 0
 16787  16788  16789  98 -16791 0
 16787  16788  16789  98  16792 0

c  -1-1 --> -2
c    ( b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧  b^{49, 2}_0 ∧ -p_98) -> ( b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0)
c  in CNF:
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨  b^{49, 3}_2
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨  b^{49, 3}_1
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨  p_98 ∨ -b^{49, 3}_0
c  in DIMACS:
-16787  16788 -16789  98  16790 0
-16787  16788 -16789  98  16791 0
-16787  16788 -16789  98 -16792 0

c  -2-1 --> break 
c    ( b^{49, 2}_2 ∧  b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨  b^{49, 2}_0 ∨  p_98 ∨ break
c  in DIMACS:
-16787 -16788  16789  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 2}_2 ∧ -b^{49, 2}_1 ∧ -b^{49, 2}_0 ∧ true) 
c  in CNF:
c    -b^{49, 2}_2 ∨  b^{49, 2}_1 ∨  b^{49, 2}_0 ∨ false 
c  in DIMACS:
-16787  16788  16789  0

c  3 does not represent an automaton state.
c    -(-b^{49, 2}_2 ∧  b^{49, 2}_1 ∧  b^{49, 2}_0 ∧ true) 
c  in CNF:
c     b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ false 
c  in DIMACS:
 16787 -16788 -16789  0
c  -3 does not represent an automaton state.
c    -( b^{49, 2}_2 ∧  b^{49, 2}_1 ∧  b^{49, 2}_0 ∧ true) 
c  in CNF:
c    -b^{49, 2}_2 ∨ -b^{49, 2}_1 ∨ -b^{49, 2}_0 ∨ false 
c  in DIMACS:
-16787 -16788 -16789  0

c i = 3
c  -2+1 --> -1
c    ( b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧  p_147) -> ( b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0)
c  in CNF:
c    -b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨  b^{49, 4}_2
c    -b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_1
c    -b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨  b^{49, 4}_0
c  in DIMACS:
-16790 -16791  16792 -147  16793 0
-16790 -16791  16792 -147 -16794 0
-16790 -16791  16792 -147  16795 0

c  -1+1 --> 0
c    ( b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0 ∧  p_147) -> (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧ -b^{49, 4}_0)
c  in CNF:
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_2
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_1
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_0
c  in DIMACS:
-16790  16791 -16792 -147 -16793 0
-16790  16791 -16792 -147 -16794 0
-16790  16791 -16792 -147 -16795 0

c  0+1 --> 1
c    (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧  p_147) -> (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0)
c  in CNF:
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_2
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_1
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨  b^{49, 4}_0
c  in DIMACS:
 16790  16791  16792 -147 -16793 0
 16790  16791  16792 -147 -16794 0
 16790  16791  16792 -147  16795 0

c  1+1 --> 2
c    (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0 ∧  p_147) -> (-b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0)
c  in CNF:
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_2
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨  b^{49, 4}_1
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ -p_147 ∨ -b^{49, 4}_0
c  in DIMACS:
 16790  16791 -16792 -147 -16793 0
 16790  16791 -16792 -147  16794 0
 16790  16791 -16792 -147 -16795 0

c  2+1 --> break 
c    (-b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧  p_147) -> break
c  in CNF:
c     b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 16790 -16791  16792 -147 1162 0


c  2-1 --> 1
c    (-b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧ -p_147) -> (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0)
c  in CNF:
c     b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_2
c     b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_1
c     b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨  b^{49, 4}_0
c  in DIMACS:
 16790 -16791  16792  147 -16793 0
 16790 -16791  16792  147 -16794 0
 16790 -16791  16792  147  16795 0

c  1-1 --> 0
c    (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0 ∧ -p_147) -> (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧ -b^{49, 4}_0)
c  in CNF:
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_2
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_1
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_0
c  in DIMACS:
 16790  16791 -16792  147 -16793 0
 16790  16791 -16792  147 -16794 0
 16790  16791 -16792  147 -16795 0

c  0-1 --> -1
c    (-b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧ -p_147) -> ( b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0)
c  in CNF:
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨  b^{49, 4}_2
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_1
c     b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨  b^{49, 4}_0
c  in DIMACS:
 16790  16791  16792  147  16793 0
 16790  16791  16792  147 -16794 0
 16790  16791  16792  147  16795 0

c  -1-1 --> -2
c    ( b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧  b^{49, 3}_0 ∧ -p_147) -> ( b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0)
c  in CNF:
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨  b^{49, 4}_2
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨  b^{49, 4}_1
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨  p_147 ∨ -b^{49, 4}_0
c  in DIMACS:
-16790  16791 -16792  147  16793 0
-16790  16791 -16792  147  16794 0
-16790  16791 -16792  147 -16795 0

c  -2-1 --> break 
c    ( b^{49, 3}_2 ∧  b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨  b^{49, 3}_0 ∨  p_147 ∨ break
c  in DIMACS:
-16790 -16791  16792  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 3}_2 ∧ -b^{49, 3}_1 ∧ -b^{49, 3}_0 ∧ true) 
c  in CNF:
c    -b^{49, 3}_2 ∨  b^{49, 3}_1 ∨  b^{49, 3}_0 ∨ false 
c  in DIMACS:
-16790  16791  16792  0

c  3 does not represent an automaton state.
c    -(-b^{49, 3}_2 ∧  b^{49, 3}_1 ∧  b^{49, 3}_0 ∧ true) 
c  in CNF:
c     b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ false 
c  in DIMACS:
 16790 -16791 -16792  0
c  -3 does not represent an automaton state.
c    -( b^{49, 3}_2 ∧  b^{49, 3}_1 ∧  b^{49, 3}_0 ∧ true) 
c  in CNF:
c    -b^{49, 3}_2 ∨ -b^{49, 3}_1 ∨ -b^{49, 3}_0 ∨ false 
c  in DIMACS:
-16790 -16791 -16792  0

c i = 4
c  -2+1 --> -1
c    ( b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧  p_196) -> ( b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0)
c  in CNF:
c    -b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨  b^{49, 5}_2
c    -b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_1
c    -b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨  b^{49, 5}_0
c  in DIMACS:
-16793 -16794  16795 -196  16796 0
-16793 -16794  16795 -196 -16797 0
-16793 -16794  16795 -196  16798 0

c  -1+1 --> 0
c    ( b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0 ∧  p_196) -> (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧ -b^{49, 5}_0)
c  in CNF:
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_2
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_1
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_0
c  in DIMACS:
-16793  16794 -16795 -196 -16796 0
-16793  16794 -16795 -196 -16797 0
-16793  16794 -16795 -196 -16798 0

c  0+1 --> 1
c    (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧  p_196) -> (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0)
c  in CNF:
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_2
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_1
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨  b^{49, 5}_0
c  in DIMACS:
 16793  16794  16795 -196 -16796 0
 16793  16794  16795 -196 -16797 0
 16793  16794  16795 -196  16798 0

c  1+1 --> 2
c    (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0 ∧  p_196) -> (-b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0)
c  in CNF:
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_2
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨  b^{49, 5}_1
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ -p_196 ∨ -b^{49, 5}_0
c  in DIMACS:
 16793  16794 -16795 -196 -16796 0
 16793  16794 -16795 -196  16797 0
 16793  16794 -16795 -196 -16798 0

c  2+1 --> break 
c    (-b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧  p_196) -> break
c  in CNF:
c     b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 16793 -16794  16795 -196 1162 0


c  2-1 --> 1
c    (-b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧ -p_196) -> (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0)
c  in CNF:
c     b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_2
c     b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_1
c     b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨  b^{49, 5}_0
c  in DIMACS:
 16793 -16794  16795  196 -16796 0
 16793 -16794  16795  196 -16797 0
 16793 -16794  16795  196  16798 0

c  1-1 --> 0
c    (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0 ∧ -p_196) -> (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧ -b^{49, 5}_0)
c  in CNF:
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_2
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_1
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_0
c  in DIMACS:
 16793  16794 -16795  196 -16796 0
 16793  16794 -16795  196 -16797 0
 16793  16794 -16795  196 -16798 0

c  0-1 --> -1
c    (-b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧ -p_196) -> ( b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0)
c  in CNF:
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨  b^{49, 5}_2
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_1
c     b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨  b^{49, 5}_0
c  in DIMACS:
 16793  16794  16795  196  16796 0
 16793  16794  16795  196 -16797 0
 16793  16794  16795  196  16798 0

c  -1-1 --> -2
c    ( b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧  b^{49, 4}_0 ∧ -p_196) -> ( b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0)
c  in CNF:
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨  b^{49, 5}_2
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨  b^{49, 5}_1
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨  p_196 ∨ -b^{49, 5}_0
c  in DIMACS:
-16793  16794 -16795  196  16796 0
-16793  16794 -16795  196  16797 0
-16793  16794 -16795  196 -16798 0

c  -2-1 --> break 
c    ( b^{49, 4}_2 ∧  b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨  b^{49, 4}_0 ∨  p_196 ∨ break
c  in DIMACS:
-16793 -16794  16795  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 4}_2 ∧ -b^{49, 4}_1 ∧ -b^{49, 4}_0 ∧ true) 
c  in CNF:
c    -b^{49, 4}_2 ∨  b^{49, 4}_1 ∨  b^{49, 4}_0 ∨ false 
c  in DIMACS:
-16793  16794  16795  0

c  3 does not represent an automaton state.
c    -(-b^{49, 4}_2 ∧  b^{49, 4}_1 ∧  b^{49, 4}_0 ∧ true) 
c  in CNF:
c     b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ false 
c  in DIMACS:
 16793 -16794 -16795  0
c  -3 does not represent an automaton state.
c    -( b^{49, 4}_2 ∧  b^{49, 4}_1 ∧  b^{49, 4}_0 ∧ true) 
c  in CNF:
c    -b^{49, 4}_2 ∨ -b^{49, 4}_1 ∨ -b^{49, 4}_0 ∨ false 
c  in DIMACS:
-16793 -16794 -16795  0

c i = 5
c  -2+1 --> -1
c    ( b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧  p_245) -> ( b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0)
c  in CNF:
c    -b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨  b^{49, 6}_2
c    -b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_1
c    -b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨  b^{49, 6}_0
c  in DIMACS:
-16796 -16797  16798 -245  16799 0
-16796 -16797  16798 -245 -16800 0
-16796 -16797  16798 -245  16801 0

c  -1+1 --> 0
c    ( b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0 ∧  p_245) -> (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧ -b^{49, 6}_0)
c  in CNF:
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_2
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_1
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_0
c  in DIMACS:
-16796  16797 -16798 -245 -16799 0
-16796  16797 -16798 -245 -16800 0
-16796  16797 -16798 -245 -16801 0

c  0+1 --> 1
c    (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧  p_245) -> (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0)
c  in CNF:
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_2
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_1
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨  b^{49, 6}_0
c  in DIMACS:
 16796  16797  16798 -245 -16799 0
 16796  16797  16798 -245 -16800 0
 16796  16797  16798 -245  16801 0

c  1+1 --> 2
c    (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0 ∧  p_245) -> (-b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0)
c  in CNF:
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_2
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨  b^{49, 6}_1
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ -p_245 ∨ -b^{49, 6}_0
c  in DIMACS:
 16796  16797 -16798 -245 -16799 0
 16796  16797 -16798 -245  16800 0
 16796  16797 -16798 -245 -16801 0

c  2+1 --> break 
c    (-b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧  p_245) -> break
c  in CNF:
c     b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 16796 -16797  16798 -245 1162 0


c  2-1 --> 1
c    (-b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧ -p_245) -> (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0)
c  in CNF:
c     b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_2
c     b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_1
c     b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨  b^{49, 6}_0
c  in DIMACS:
 16796 -16797  16798  245 -16799 0
 16796 -16797  16798  245 -16800 0
 16796 -16797  16798  245  16801 0

c  1-1 --> 0
c    (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0 ∧ -p_245) -> (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧ -b^{49, 6}_0)
c  in CNF:
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_2
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_1
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_0
c  in DIMACS:
 16796  16797 -16798  245 -16799 0
 16796  16797 -16798  245 -16800 0
 16796  16797 -16798  245 -16801 0

c  0-1 --> -1
c    (-b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧ -p_245) -> ( b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0)
c  in CNF:
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨  b^{49, 6}_2
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_1
c     b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨  b^{49, 6}_0
c  in DIMACS:
 16796  16797  16798  245  16799 0
 16796  16797  16798  245 -16800 0
 16796  16797  16798  245  16801 0

c  -1-1 --> -2
c    ( b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧  b^{49, 5}_0 ∧ -p_245) -> ( b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0)
c  in CNF:
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨  b^{49, 6}_2
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨  b^{49, 6}_1
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨  p_245 ∨ -b^{49, 6}_0
c  in DIMACS:
-16796  16797 -16798  245  16799 0
-16796  16797 -16798  245  16800 0
-16796  16797 -16798  245 -16801 0

c  -2-1 --> break 
c    ( b^{49, 5}_2 ∧  b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨  b^{49, 5}_0 ∨  p_245 ∨ break
c  in DIMACS:
-16796 -16797  16798  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 5}_2 ∧ -b^{49, 5}_1 ∧ -b^{49, 5}_0 ∧ true) 
c  in CNF:
c    -b^{49, 5}_2 ∨  b^{49, 5}_1 ∨  b^{49, 5}_0 ∨ false 
c  in DIMACS:
-16796  16797  16798  0

c  3 does not represent an automaton state.
c    -(-b^{49, 5}_2 ∧  b^{49, 5}_1 ∧  b^{49, 5}_0 ∧ true) 
c  in CNF:
c     b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ false 
c  in DIMACS:
 16796 -16797 -16798  0
c  -3 does not represent an automaton state.
c    -( b^{49, 5}_2 ∧  b^{49, 5}_1 ∧  b^{49, 5}_0 ∧ true) 
c  in CNF:
c    -b^{49, 5}_2 ∨ -b^{49, 5}_1 ∨ -b^{49, 5}_0 ∨ false 
c  in DIMACS:
-16796 -16797 -16798  0

c i = 6
c  -2+1 --> -1
c    ( b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧  p_294) -> ( b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0)
c  in CNF:
c    -b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨  b^{49, 7}_2
c    -b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_1
c    -b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨  b^{49, 7}_0
c  in DIMACS:
-16799 -16800  16801 -294  16802 0
-16799 -16800  16801 -294 -16803 0
-16799 -16800  16801 -294  16804 0

c  -1+1 --> 0
c    ( b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0 ∧  p_294) -> (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧ -b^{49, 7}_0)
c  in CNF:
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_2
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_1
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_0
c  in DIMACS:
-16799  16800 -16801 -294 -16802 0
-16799  16800 -16801 -294 -16803 0
-16799  16800 -16801 -294 -16804 0

c  0+1 --> 1
c    (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧  p_294) -> (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0)
c  in CNF:
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_2
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_1
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨  b^{49, 7}_0
c  in DIMACS:
 16799  16800  16801 -294 -16802 0
 16799  16800  16801 -294 -16803 0
 16799  16800  16801 -294  16804 0

c  1+1 --> 2
c    (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0 ∧  p_294) -> (-b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0)
c  in CNF:
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_2
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨  b^{49, 7}_1
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ -p_294 ∨ -b^{49, 7}_0
c  in DIMACS:
 16799  16800 -16801 -294 -16802 0
 16799  16800 -16801 -294  16803 0
 16799  16800 -16801 -294 -16804 0

c  2+1 --> break 
c    (-b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧  p_294) -> break
c  in CNF:
c     b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 16799 -16800  16801 -294 1162 0


c  2-1 --> 1
c    (-b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧ -p_294) -> (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0)
c  in CNF:
c     b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_2
c     b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_1
c     b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨  b^{49, 7}_0
c  in DIMACS:
 16799 -16800  16801  294 -16802 0
 16799 -16800  16801  294 -16803 0
 16799 -16800  16801  294  16804 0

c  1-1 --> 0
c    (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0 ∧ -p_294) -> (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧ -b^{49, 7}_0)
c  in CNF:
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_2
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_1
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_0
c  in DIMACS:
 16799  16800 -16801  294 -16802 0
 16799  16800 -16801  294 -16803 0
 16799  16800 -16801  294 -16804 0

c  0-1 --> -1
c    (-b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧ -p_294) -> ( b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0)
c  in CNF:
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨  b^{49, 7}_2
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_1
c     b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨  b^{49, 7}_0
c  in DIMACS:
 16799  16800  16801  294  16802 0
 16799  16800  16801  294 -16803 0
 16799  16800  16801  294  16804 0

c  -1-1 --> -2
c    ( b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧  b^{49, 6}_0 ∧ -p_294) -> ( b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0)
c  in CNF:
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨  b^{49, 7}_2
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨  b^{49, 7}_1
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨  p_294 ∨ -b^{49, 7}_0
c  in DIMACS:
-16799  16800 -16801  294  16802 0
-16799  16800 -16801  294  16803 0
-16799  16800 -16801  294 -16804 0

c  -2-1 --> break 
c    ( b^{49, 6}_2 ∧  b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨  b^{49, 6}_0 ∨  p_294 ∨ break
c  in DIMACS:
-16799 -16800  16801  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 6}_2 ∧ -b^{49, 6}_1 ∧ -b^{49, 6}_0 ∧ true) 
c  in CNF:
c    -b^{49, 6}_2 ∨  b^{49, 6}_1 ∨  b^{49, 6}_0 ∨ false 
c  in DIMACS:
-16799  16800  16801  0

c  3 does not represent an automaton state.
c    -(-b^{49, 6}_2 ∧  b^{49, 6}_1 ∧  b^{49, 6}_0 ∧ true) 
c  in CNF:
c     b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ false 
c  in DIMACS:
 16799 -16800 -16801  0
c  -3 does not represent an automaton state.
c    -( b^{49, 6}_2 ∧  b^{49, 6}_1 ∧  b^{49, 6}_0 ∧ true) 
c  in CNF:
c    -b^{49, 6}_2 ∨ -b^{49, 6}_1 ∨ -b^{49, 6}_0 ∨ false 
c  in DIMACS:
-16799 -16800 -16801  0

c i = 7
c  -2+1 --> -1
c    ( b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧  p_343) -> ( b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0)
c  in CNF:
c    -b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨  b^{49, 8}_2
c    -b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_1
c    -b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨  b^{49, 8}_0
c  in DIMACS:
-16802 -16803  16804 -343  16805 0
-16802 -16803  16804 -343 -16806 0
-16802 -16803  16804 -343  16807 0

c  -1+1 --> 0
c    ( b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0 ∧  p_343) -> (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧ -b^{49, 8}_0)
c  in CNF:
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_2
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_1
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_0
c  in DIMACS:
-16802  16803 -16804 -343 -16805 0
-16802  16803 -16804 -343 -16806 0
-16802  16803 -16804 -343 -16807 0

c  0+1 --> 1
c    (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧  p_343) -> (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0)
c  in CNF:
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_2
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_1
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨  b^{49, 8}_0
c  in DIMACS:
 16802  16803  16804 -343 -16805 0
 16802  16803  16804 -343 -16806 0
 16802  16803  16804 -343  16807 0

c  1+1 --> 2
c    (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0 ∧  p_343) -> (-b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0)
c  in CNF:
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_2
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨  b^{49, 8}_1
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ -p_343 ∨ -b^{49, 8}_0
c  in DIMACS:
 16802  16803 -16804 -343 -16805 0
 16802  16803 -16804 -343  16806 0
 16802  16803 -16804 -343 -16807 0

c  2+1 --> break 
c    (-b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧  p_343) -> break
c  in CNF:
c     b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ -p_343 ∨ break
c  in DIMACS:
 16802 -16803  16804 -343 1162 0


c  2-1 --> 1
c    (-b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧ -p_343) -> (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0)
c  in CNF:
c     b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_2
c     b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_1
c     b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨  b^{49, 8}_0
c  in DIMACS:
 16802 -16803  16804  343 -16805 0
 16802 -16803  16804  343 -16806 0
 16802 -16803  16804  343  16807 0

c  1-1 --> 0
c    (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0 ∧ -p_343) -> (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧ -b^{49, 8}_0)
c  in CNF:
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_2
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_1
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_0
c  in DIMACS:
 16802  16803 -16804  343 -16805 0
 16802  16803 -16804  343 -16806 0
 16802  16803 -16804  343 -16807 0

c  0-1 --> -1
c    (-b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧ -p_343) -> ( b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0)
c  in CNF:
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨  b^{49, 8}_2
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_1
c     b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨  b^{49, 8}_0
c  in DIMACS:
 16802  16803  16804  343  16805 0
 16802  16803  16804  343 -16806 0
 16802  16803  16804  343  16807 0

c  -1-1 --> -2
c    ( b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧  b^{49, 7}_0 ∧ -p_343) -> ( b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0)
c  in CNF:
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨  b^{49, 8}_2
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨  b^{49, 8}_1
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨  p_343 ∨ -b^{49, 8}_0
c  in DIMACS:
-16802  16803 -16804  343  16805 0
-16802  16803 -16804  343  16806 0
-16802  16803 -16804  343 -16807 0

c  -2-1 --> break 
c    ( b^{49, 7}_2 ∧  b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧ -p_343) -> break
c  in CNF:
c    -b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨  b^{49, 7}_0 ∨  p_343 ∨ break
c  in DIMACS:
-16802 -16803  16804  343 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 7}_2 ∧ -b^{49, 7}_1 ∧ -b^{49, 7}_0 ∧ true) 
c  in CNF:
c    -b^{49, 7}_2 ∨  b^{49, 7}_1 ∨  b^{49, 7}_0 ∨ false 
c  in DIMACS:
-16802  16803  16804  0

c  3 does not represent an automaton state.
c    -(-b^{49, 7}_2 ∧  b^{49, 7}_1 ∧  b^{49, 7}_0 ∧ true) 
c  in CNF:
c     b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ false 
c  in DIMACS:
 16802 -16803 -16804  0
c  -3 does not represent an automaton state.
c    -( b^{49, 7}_2 ∧  b^{49, 7}_1 ∧  b^{49, 7}_0 ∧ true) 
c  in CNF:
c    -b^{49, 7}_2 ∨ -b^{49, 7}_1 ∨ -b^{49, 7}_0 ∨ false 
c  in DIMACS:
-16802 -16803 -16804  0

c i = 8
c  -2+1 --> -1
c    ( b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧  p_392) -> ( b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0)
c  in CNF:
c    -b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨  b^{49, 9}_2
c    -b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_1
c    -b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨  b^{49, 9}_0
c  in DIMACS:
-16805 -16806  16807 -392  16808 0
-16805 -16806  16807 -392 -16809 0
-16805 -16806  16807 -392  16810 0

c  -1+1 --> 0
c    ( b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0 ∧  p_392) -> (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧ -b^{49, 9}_0)
c  in CNF:
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_2
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_1
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_0
c  in DIMACS:
-16805  16806 -16807 -392 -16808 0
-16805  16806 -16807 -392 -16809 0
-16805  16806 -16807 -392 -16810 0

c  0+1 --> 1
c    (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧  p_392) -> (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0)
c  in CNF:
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_2
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_1
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨  b^{49, 9}_0
c  in DIMACS:
 16805  16806  16807 -392 -16808 0
 16805  16806  16807 -392 -16809 0
 16805  16806  16807 -392  16810 0

c  1+1 --> 2
c    (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0 ∧  p_392) -> (-b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0)
c  in CNF:
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_2
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨  b^{49, 9}_1
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ -p_392 ∨ -b^{49, 9}_0
c  in DIMACS:
 16805  16806 -16807 -392 -16808 0
 16805  16806 -16807 -392  16809 0
 16805  16806 -16807 -392 -16810 0

c  2+1 --> break 
c    (-b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧  p_392) -> break
c  in CNF:
c     b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 16805 -16806  16807 -392 1162 0


c  2-1 --> 1
c    (-b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧ -p_392) -> (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0)
c  in CNF:
c     b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_2
c     b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_1
c     b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨  b^{49, 9}_0
c  in DIMACS:
 16805 -16806  16807  392 -16808 0
 16805 -16806  16807  392 -16809 0
 16805 -16806  16807  392  16810 0

c  1-1 --> 0
c    (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0 ∧ -p_392) -> (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧ -b^{49, 9}_0)
c  in CNF:
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_2
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_1
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_0
c  in DIMACS:
 16805  16806 -16807  392 -16808 0
 16805  16806 -16807  392 -16809 0
 16805  16806 -16807  392 -16810 0

c  0-1 --> -1
c    (-b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧ -p_392) -> ( b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0)
c  in CNF:
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨  b^{49, 9}_2
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_1
c     b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨  b^{49, 9}_0
c  in DIMACS:
 16805  16806  16807  392  16808 0
 16805  16806  16807  392 -16809 0
 16805  16806  16807  392  16810 0

c  -1-1 --> -2
c    ( b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧  b^{49, 8}_0 ∧ -p_392) -> ( b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0)
c  in CNF:
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨  b^{49, 9}_2
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨  b^{49, 9}_1
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨  p_392 ∨ -b^{49, 9}_0
c  in DIMACS:
-16805  16806 -16807  392  16808 0
-16805  16806 -16807  392  16809 0
-16805  16806 -16807  392 -16810 0

c  -2-1 --> break 
c    ( b^{49, 8}_2 ∧  b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨  b^{49, 8}_0 ∨  p_392 ∨ break
c  in DIMACS:
-16805 -16806  16807  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 8}_2 ∧ -b^{49, 8}_1 ∧ -b^{49, 8}_0 ∧ true) 
c  in CNF:
c    -b^{49, 8}_2 ∨  b^{49, 8}_1 ∨  b^{49, 8}_0 ∨ false 
c  in DIMACS:
-16805  16806  16807  0

c  3 does not represent an automaton state.
c    -(-b^{49, 8}_2 ∧  b^{49, 8}_1 ∧  b^{49, 8}_0 ∧ true) 
c  in CNF:
c     b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ false 
c  in DIMACS:
 16805 -16806 -16807  0
c  -3 does not represent an automaton state.
c    -( b^{49, 8}_2 ∧  b^{49, 8}_1 ∧  b^{49, 8}_0 ∧ true) 
c  in CNF:
c    -b^{49, 8}_2 ∨ -b^{49, 8}_1 ∨ -b^{49, 8}_0 ∨ false 
c  in DIMACS:
-16805 -16806 -16807  0

c i = 9
c  -2+1 --> -1
c    ( b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧  p_441) -> ( b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0)
c  in CNF:
c    -b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨  b^{49, 10}_2
c    -b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_1
c    -b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨  b^{49, 10}_0
c  in DIMACS:
-16808 -16809  16810 -441  16811 0
-16808 -16809  16810 -441 -16812 0
-16808 -16809  16810 -441  16813 0

c  -1+1 --> 0
c    ( b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0 ∧  p_441) -> (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧ -b^{49, 10}_0)
c  in CNF:
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_2
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_1
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_0
c  in DIMACS:
-16808  16809 -16810 -441 -16811 0
-16808  16809 -16810 -441 -16812 0
-16808  16809 -16810 -441 -16813 0

c  0+1 --> 1
c    (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧  p_441) -> (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0)
c  in CNF:
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_2
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_1
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨  b^{49, 10}_0
c  in DIMACS:
 16808  16809  16810 -441 -16811 0
 16808  16809  16810 -441 -16812 0
 16808  16809  16810 -441  16813 0

c  1+1 --> 2
c    (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0 ∧  p_441) -> (-b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0)
c  in CNF:
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_2
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨  b^{49, 10}_1
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ -p_441 ∨ -b^{49, 10}_0
c  in DIMACS:
 16808  16809 -16810 -441 -16811 0
 16808  16809 -16810 -441  16812 0
 16808  16809 -16810 -441 -16813 0

c  2+1 --> break 
c    (-b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧  p_441) -> break
c  in CNF:
c     b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 16808 -16809  16810 -441 1162 0


c  2-1 --> 1
c    (-b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧ -p_441) -> (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0)
c  in CNF:
c     b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_2
c     b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_1
c     b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨  b^{49, 10}_0
c  in DIMACS:
 16808 -16809  16810  441 -16811 0
 16808 -16809  16810  441 -16812 0
 16808 -16809  16810  441  16813 0

c  1-1 --> 0
c    (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0 ∧ -p_441) -> (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧ -b^{49, 10}_0)
c  in CNF:
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_2
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_1
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_0
c  in DIMACS:
 16808  16809 -16810  441 -16811 0
 16808  16809 -16810  441 -16812 0
 16808  16809 -16810  441 -16813 0

c  0-1 --> -1
c    (-b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧ -p_441) -> ( b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0)
c  in CNF:
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨  b^{49, 10}_2
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_1
c     b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨  b^{49, 10}_0
c  in DIMACS:
 16808  16809  16810  441  16811 0
 16808  16809  16810  441 -16812 0
 16808  16809  16810  441  16813 0

c  -1-1 --> -2
c    ( b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧  b^{49, 9}_0 ∧ -p_441) -> ( b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0)
c  in CNF:
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨  b^{49, 10}_2
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨  b^{49, 10}_1
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨  p_441 ∨ -b^{49, 10}_0
c  in DIMACS:
-16808  16809 -16810  441  16811 0
-16808  16809 -16810  441  16812 0
-16808  16809 -16810  441 -16813 0

c  -2-1 --> break 
c    ( b^{49, 9}_2 ∧  b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨  b^{49, 9}_0 ∨  p_441 ∨ break
c  in DIMACS:
-16808 -16809  16810  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 9}_2 ∧ -b^{49, 9}_1 ∧ -b^{49, 9}_0 ∧ true) 
c  in CNF:
c    -b^{49, 9}_2 ∨  b^{49, 9}_1 ∨  b^{49, 9}_0 ∨ false 
c  in DIMACS:
-16808  16809  16810  0

c  3 does not represent an automaton state.
c    -(-b^{49, 9}_2 ∧  b^{49, 9}_1 ∧  b^{49, 9}_0 ∧ true) 
c  in CNF:
c     b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ false 
c  in DIMACS:
 16808 -16809 -16810  0
c  -3 does not represent an automaton state.
c    -( b^{49, 9}_2 ∧  b^{49, 9}_1 ∧  b^{49, 9}_0 ∧ true) 
c  in CNF:
c    -b^{49, 9}_2 ∨ -b^{49, 9}_1 ∨ -b^{49, 9}_0 ∨ false 
c  in DIMACS:
-16808 -16809 -16810  0

c i = 10
c  -2+1 --> -1
c    ( b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧  p_490) -> ( b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0)
c  in CNF:
c    -b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨  b^{49, 11}_2
c    -b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_1
c    -b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨  b^{49, 11}_0
c  in DIMACS:
-16811 -16812  16813 -490  16814 0
-16811 -16812  16813 -490 -16815 0
-16811 -16812  16813 -490  16816 0

c  -1+1 --> 0
c    ( b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0 ∧  p_490) -> (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧ -b^{49, 11}_0)
c  in CNF:
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_2
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_1
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_0
c  in DIMACS:
-16811  16812 -16813 -490 -16814 0
-16811  16812 -16813 -490 -16815 0
-16811  16812 -16813 -490 -16816 0

c  0+1 --> 1
c    (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧  p_490) -> (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0)
c  in CNF:
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_2
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_1
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨  b^{49, 11}_0
c  in DIMACS:
 16811  16812  16813 -490 -16814 0
 16811  16812  16813 -490 -16815 0
 16811  16812  16813 -490  16816 0

c  1+1 --> 2
c    (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0 ∧  p_490) -> (-b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0)
c  in CNF:
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_2
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨  b^{49, 11}_1
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ -p_490 ∨ -b^{49, 11}_0
c  in DIMACS:
 16811  16812 -16813 -490 -16814 0
 16811  16812 -16813 -490  16815 0
 16811  16812 -16813 -490 -16816 0

c  2+1 --> break 
c    (-b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧  p_490) -> break
c  in CNF:
c     b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 16811 -16812  16813 -490 1162 0


c  2-1 --> 1
c    (-b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧ -p_490) -> (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0)
c  in CNF:
c     b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_2
c     b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_1
c     b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨  b^{49, 11}_0
c  in DIMACS:
 16811 -16812  16813  490 -16814 0
 16811 -16812  16813  490 -16815 0
 16811 -16812  16813  490  16816 0

c  1-1 --> 0
c    (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0 ∧ -p_490) -> (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧ -b^{49, 11}_0)
c  in CNF:
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_2
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_1
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_0
c  in DIMACS:
 16811  16812 -16813  490 -16814 0
 16811  16812 -16813  490 -16815 0
 16811  16812 -16813  490 -16816 0

c  0-1 --> -1
c    (-b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧ -p_490) -> ( b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0)
c  in CNF:
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨  b^{49, 11}_2
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_1
c     b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨  b^{49, 11}_0
c  in DIMACS:
 16811  16812  16813  490  16814 0
 16811  16812  16813  490 -16815 0
 16811  16812  16813  490  16816 0

c  -1-1 --> -2
c    ( b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧  b^{49, 10}_0 ∧ -p_490) -> ( b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0)
c  in CNF:
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨  b^{49, 11}_2
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨  b^{49, 11}_1
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨  p_490 ∨ -b^{49, 11}_0
c  in DIMACS:
-16811  16812 -16813  490  16814 0
-16811  16812 -16813  490  16815 0
-16811  16812 -16813  490 -16816 0

c  -2-1 --> break 
c    ( b^{49, 10}_2 ∧  b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨  b^{49, 10}_0 ∨  p_490 ∨ break
c  in DIMACS:
-16811 -16812  16813  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 10}_2 ∧ -b^{49, 10}_1 ∧ -b^{49, 10}_0 ∧ true) 
c  in CNF:
c    -b^{49, 10}_2 ∨  b^{49, 10}_1 ∨  b^{49, 10}_0 ∨ false 
c  in DIMACS:
-16811  16812  16813  0

c  3 does not represent an automaton state.
c    -(-b^{49, 10}_2 ∧  b^{49, 10}_1 ∧  b^{49, 10}_0 ∧ true) 
c  in CNF:
c     b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ false 
c  in DIMACS:
 16811 -16812 -16813  0
c  -3 does not represent an automaton state.
c    -( b^{49, 10}_2 ∧  b^{49, 10}_1 ∧  b^{49, 10}_0 ∧ true) 
c  in CNF:
c    -b^{49, 10}_2 ∨ -b^{49, 10}_1 ∨ -b^{49, 10}_0 ∨ false 
c  in DIMACS:
-16811 -16812 -16813  0

c i = 11
c  -2+1 --> -1
c    ( b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧  p_539) -> ( b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0)
c  in CNF:
c    -b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨  b^{49, 12}_2
c    -b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_1
c    -b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨  b^{49, 12}_0
c  in DIMACS:
-16814 -16815  16816 -539  16817 0
-16814 -16815  16816 -539 -16818 0
-16814 -16815  16816 -539  16819 0

c  -1+1 --> 0
c    ( b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0 ∧  p_539) -> (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧ -b^{49, 12}_0)
c  in CNF:
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_2
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_1
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_0
c  in DIMACS:
-16814  16815 -16816 -539 -16817 0
-16814  16815 -16816 -539 -16818 0
-16814  16815 -16816 -539 -16819 0

c  0+1 --> 1
c    (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧  p_539) -> (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0)
c  in CNF:
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_2
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_1
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨  b^{49, 12}_0
c  in DIMACS:
 16814  16815  16816 -539 -16817 0
 16814  16815  16816 -539 -16818 0
 16814  16815  16816 -539  16819 0

c  1+1 --> 2
c    (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0 ∧  p_539) -> (-b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0)
c  in CNF:
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_2
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨  b^{49, 12}_1
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ -p_539 ∨ -b^{49, 12}_0
c  in DIMACS:
 16814  16815 -16816 -539 -16817 0
 16814  16815 -16816 -539  16818 0
 16814  16815 -16816 -539 -16819 0

c  2+1 --> break 
c    (-b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧  p_539) -> break
c  in CNF:
c     b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ -p_539 ∨ break
c  in DIMACS:
 16814 -16815  16816 -539 1162 0


c  2-1 --> 1
c    (-b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧ -p_539) -> (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0)
c  in CNF:
c     b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_2
c     b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_1
c     b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨  b^{49, 12}_0
c  in DIMACS:
 16814 -16815  16816  539 -16817 0
 16814 -16815  16816  539 -16818 0
 16814 -16815  16816  539  16819 0

c  1-1 --> 0
c    (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0 ∧ -p_539) -> (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧ -b^{49, 12}_0)
c  in CNF:
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_2
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_1
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_0
c  in DIMACS:
 16814  16815 -16816  539 -16817 0
 16814  16815 -16816  539 -16818 0
 16814  16815 -16816  539 -16819 0

c  0-1 --> -1
c    (-b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧ -p_539) -> ( b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0)
c  in CNF:
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨  b^{49, 12}_2
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_1
c     b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨  b^{49, 12}_0
c  in DIMACS:
 16814  16815  16816  539  16817 0
 16814  16815  16816  539 -16818 0
 16814  16815  16816  539  16819 0

c  -1-1 --> -2
c    ( b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧  b^{49, 11}_0 ∧ -p_539) -> ( b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0)
c  in CNF:
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨  b^{49, 12}_2
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨  b^{49, 12}_1
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨  p_539 ∨ -b^{49, 12}_0
c  in DIMACS:
-16814  16815 -16816  539  16817 0
-16814  16815 -16816  539  16818 0
-16814  16815 -16816  539 -16819 0

c  -2-1 --> break 
c    ( b^{49, 11}_2 ∧  b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧ -p_539) -> break
c  in CNF:
c    -b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨  b^{49, 11}_0 ∨  p_539 ∨ break
c  in DIMACS:
-16814 -16815  16816  539 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 11}_2 ∧ -b^{49, 11}_1 ∧ -b^{49, 11}_0 ∧ true) 
c  in CNF:
c    -b^{49, 11}_2 ∨  b^{49, 11}_1 ∨  b^{49, 11}_0 ∨ false 
c  in DIMACS:
-16814  16815  16816  0

c  3 does not represent an automaton state.
c    -(-b^{49, 11}_2 ∧  b^{49, 11}_1 ∧  b^{49, 11}_0 ∧ true) 
c  in CNF:
c     b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ false 
c  in DIMACS:
 16814 -16815 -16816  0
c  -3 does not represent an automaton state.
c    -( b^{49, 11}_2 ∧  b^{49, 11}_1 ∧  b^{49, 11}_0 ∧ true) 
c  in CNF:
c    -b^{49, 11}_2 ∨ -b^{49, 11}_1 ∨ -b^{49, 11}_0 ∨ false 
c  in DIMACS:
-16814 -16815 -16816  0

c i = 12
c  -2+1 --> -1
c    ( b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧  p_588) -> ( b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0)
c  in CNF:
c    -b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨  b^{49, 13}_2
c    -b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_1
c    -b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨  b^{49, 13}_0
c  in DIMACS:
-16817 -16818  16819 -588  16820 0
-16817 -16818  16819 -588 -16821 0
-16817 -16818  16819 -588  16822 0

c  -1+1 --> 0
c    ( b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0 ∧  p_588) -> (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧ -b^{49, 13}_0)
c  in CNF:
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_2
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_1
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_0
c  in DIMACS:
-16817  16818 -16819 -588 -16820 0
-16817  16818 -16819 -588 -16821 0
-16817  16818 -16819 -588 -16822 0

c  0+1 --> 1
c    (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧  p_588) -> (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0)
c  in CNF:
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_2
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_1
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨  b^{49, 13}_0
c  in DIMACS:
 16817  16818  16819 -588 -16820 0
 16817  16818  16819 -588 -16821 0
 16817  16818  16819 -588  16822 0

c  1+1 --> 2
c    (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0 ∧  p_588) -> (-b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0)
c  in CNF:
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_2
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨  b^{49, 13}_1
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ -p_588 ∨ -b^{49, 13}_0
c  in DIMACS:
 16817  16818 -16819 -588 -16820 0
 16817  16818 -16819 -588  16821 0
 16817  16818 -16819 -588 -16822 0

c  2+1 --> break 
c    (-b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧  p_588) -> break
c  in CNF:
c     b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 16817 -16818  16819 -588 1162 0


c  2-1 --> 1
c    (-b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧ -p_588) -> (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0)
c  in CNF:
c     b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_2
c     b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_1
c     b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨  b^{49, 13}_0
c  in DIMACS:
 16817 -16818  16819  588 -16820 0
 16817 -16818  16819  588 -16821 0
 16817 -16818  16819  588  16822 0

c  1-1 --> 0
c    (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0 ∧ -p_588) -> (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧ -b^{49, 13}_0)
c  in CNF:
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_2
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_1
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_0
c  in DIMACS:
 16817  16818 -16819  588 -16820 0
 16817  16818 -16819  588 -16821 0
 16817  16818 -16819  588 -16822 0

c  0-1 --> -1
c    (-b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧ -p_588) -> ( b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0)
c  in CNF:
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨  b^{49, 13}_2
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_1
c     b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨  b^{49, 13}_0
c  in DIMACS:
 16817  16818  16819  588  16820 0
 16817  16818  16819  588 -16821 0
 16817  16818  16819  588  16822 0

c  -1-1 --> -2
c    ( b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧  b^{49, 12}_0 ∧ -p_588) -> ( b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0)
c  in CNF:
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨  b^{49, 13}_2
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨  b^{49, 13}_1
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨  p_588 ∨ -b^{49, 13}_0
c  in DIMACS:
-16817  16818 -16819  588  16820 0
-16817  16818 -16819  588  16821 0
-16817  16818 -16819  588 -16822 0

c  -2-1 --> break 
c    ( b^{49, 12}_2 ∧  b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨  b^{49, 12}_0 ∨  p_588 ∨ break
c  in DIMACS:
-16817 -16818  16819  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 12}_2 ∧ -b^{49, 12}_1 ∧ -b^{49, 12}_0 ∧ true) 
c  in CNF:
c    -b^{49, 12}_2 ∨  b^{49, 12}_1 ∨  b^{49, 12}_0 ∨ false 
c  in DIMACS:
-16817  16818  16819  0

c  3 does not represent an automaton state.
c    -(-b^{49, 12}_2 ∧  b^{49, 12}_1 ∧  b^{49, 12}_0 ∧ true) 
c  in CNF:
c     b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ false 
c  in DIMACS:
 16817 -16818 -16819  0
c  -3 does not represent an automaton state.
c    -( b^{49, 12}_2 ∧  b^{49, 12}_1 ∧  b^{49, 12}_0 ∧ true) 
c  in CNF:
c    -b^{49, 12}_2 ∨ -b^{49, 12}_1 ∨ -b^{49, 12}_0 ∨ false 
c  in DIMACS:
-16817 -16818 -16819  0

c i = 13
c  -2+1 --> -1
c    ( b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧  p_637) -> ( b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0)
c  in CNF:
c    -b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨  b^{49, 14}_2
c    -b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_1
c    -b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨  b^{49, 14}_0
c  in DIMACS:
-16820 -16821  16822 -637  16823 0
-16820 -16821  16822 -637 -16824 0
-16820 -16821  16822 -637  16825 0

c  -1+1 --> 0
c    ( b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0 ∧  p_637) -> (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧ -b^{49, 14}_0)
c  in CNF:
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_2
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_1
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_0
c  in DIMACS:
-16820  16821 -16822 -637 -16823 0
-16820  16821 -16822 -637 -16824 0
-16820  16821 -16822 -637 -16825 0

c  0+1 --> 1
c    (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧  p_637) -> (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0)
c  in CNF:
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_2
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_1
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨  b^{49, 14}_0
c  in DIMACS:
 16820  16821  16822 -637 -16823 0
 16820  16821  16822 -637 -16824 0
 16820  16821  16822 -637  16825 0

c  1+1 --> 2
c    (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0 ∧  p_637) -> (-b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0)
c  in CNF:
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_2
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨  b^{49, 14}_1
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ -p_637 ∨ -b^{49, 14}_0
c  in DIMACS:
 16820  16821 -16822 -637 -16823 0
 16820  16821 -16822 -637  16824 0
 16820  16821 -16822 -637 -16825 0

c  2+1 --> break 
c    (-b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧  p_637) -> break
c  in CNF:
c     b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ -p_637 ∨ break
c  in DIMACS:
 16820 -16821  16822 -637 1162 0


c  2-1 --> 1
c    (-b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧ -p_637) -> (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0)
c  in CNF:
c     b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_2
c     b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_1
c     b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨  b^{49, 14}_0
c  in DIMACS:
 16820 -16821  16822  637 -16823 0
 16820 -16821  16822  637 -16824 0
 16820 -16821  16822  637  16825 0

c  1-1 --> 0
c    (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0 ∧ -p_637) -> (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧ -b^{49, 14}_0)
c  in CNF:
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_2
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_1
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_0
c  in DIMACS:
 16820  16821 -16822  637 -16823 0
 16820  16821 -16822  637 -16824 0
 16820  16821 -16822  637 -16825 0

c  0-1 --> -1
c    (-b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧ -p_637) -> ( b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0)
c  in CNF:
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨  b^{49, 14}_2
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_1
c     b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨  b^{49, 14}_0
c  in DIMACS:
 16820  16821  16822  637  16823 0
 16820  16821  16822  637 -16824 0
 16820  16821  16822  637  16825 0

c  -1-1 --> -2
c    ( b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧  b^{49, 13}_0 ∧ -p_637) -> ( b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0)
c  in CNF:
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨  b^{49, 14}_2
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨  b^{49, 14}_1
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨  p_637 ∨ -b^{49, 14}_0
c  in DIMACS:
-16820  16821 -16822  637  16823 0
-16820  16821 -16822  637  16824 0
-16820  16821 -16822  637 -16825 0

c  -2-1 --> break 
c    ( b^{49, 13}_2 ∧  b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧ -p_637) -> break
c  in CNF:
c    -b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨  b^{49, 13}_0 ∨  p_637 ∨ break
c  in DIMACS:
-16820 -16821  16822  637 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 13}_2 ∧ -b^{49, 13}_1 ∧ -b^{49, 13}_0 ∧ true) 
c  in CNF:
c    -b^{49, 13}_2 ∨  b^{49, 13}_1 ∨  b^{49, 13}_0 ∨ false 
c  in DIMACS:
-16820  16821  16822  0

c  3 does not represent an automaton state.
c    -(-b^{49, 13}_2 ∧  b^{49, 13}_1 ∧  b^{49, 13}_0 ∧ true) 
c  in CNF:
c     b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ false 
c  in DIMACS:
 16820 -16821 -16822  0
c  -3 does not represent an automaton state.
c    -( b^{49, 13}_2 ∧  b^{49, 13}_1 ∧  b^{49, 13}_0 ∧ true) 
c  in CNF:
c    -b^{49, 13}_2 ∨ -b^{49, 13}_1 ∨ -b^{49, 13}_0 ∨ false 
c  in DIMACS:
-16820 -16821 -16822  0

c i = 14
c  -2+1 --> -1
c    ( b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧  p_686) -> ( b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0)
c  in CNF:
c    -b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨  b^{49, 15}_2
c    -b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_1
c    -b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨  b^{49, 15}_0
c  in DIMACS:
-16823 -16824  16825 -686  16826 0
-16823 -16824  16825 -686 -16827 0
-16823 -16824  16825 -686  16828 0

c  -1+1 --> 0
c    ( b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0 ∧  p_686) -> (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧ -b^{49, 15}_0)
c  in CNF:
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_2
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_1
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_0
c  in DIMACS:
-16823  16824 -16825 -686 -16826 0
-16823  16824 -16825 -686 -16827 0
-16823  16824 -16825 -686 -16828 0

c  0+1 --> 1
c    (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧  p_686) -> (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0)
c  in CNF:
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_2
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_1
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨  b^{49, 15}_0
c  in DIMACS:
 16823  16824  16825 -686 -16826 0
 16823  16824  16825 -686 -16827 0
 16823  16824  16825 -686  16828 0

c  1+1 --> 2
c    (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0 ∧  p_686) -> (-b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0)
c  in CNF:
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_2
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨  b^{49, 15}_1
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ -p_686 ∨ -b^{49, 15}_0
c  in DIMACS:
 16823  16824 -16825 -686 -16826 0
 16823  16824 -16825 -686  16827 0
 16823  16824 -16825 -686 -16828 0

c  2+1 --> break 
c    (-b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧  p_686) -> break
c  in CNF:
c     b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 16823 -16824  16825 -686 1162 0


c  2-1 --> 1
c    (-b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧ -p_686) -> (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0)
c  in CNF:
c     b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_2
c     b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_1
c     b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨  b^{49, 15}_0
c  in DIMACS:
 16823 -16824  16825  686 -16826 0
 16823 -16824  16825  686 -16827 0
 16823 -16824  16825  686  16828 0

c  1-1 --> 0
c    (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0 ∧ -p_686) -> (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧ -b^{49, 15}_0)
c  in CNF:
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_2
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_1
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_0
c  in DIMACS:
 16823  16824 -16825  686 -16826 0
 16823  16824 -16825  686 -16827 0
 16823  16824 -16825  686 -16828 0

c  0-1 --> -1
c    (-b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧ -p_686) -> ( b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0)
c  in CNF:
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨  b^{49, 15}_2
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_1
c     b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨  b^{49, 15}_0
c  in DIMACS:
 16823  16824  16825  686  16826 0
 16823  16824  16825  686 -16827 0
 16823  16824  16825  686  16828 0

c  -1-1 --> -2
c    ( b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧  b^{49, 14}_0 ∧ -p_686) -> ( b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0)
c  in CNF:
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨  b^{49, 15}_2
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨  b^{49, 15}_1
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨  p_686 ∨ -b^{49, 15}_0
c  in DIMACS:
-16823  16824 -16825  686  16826 0
-16823  16824 -16825  686  16827 0
-16823  16824 -16825  686 -16828 0

c  -2-1 --> break 
c    ( b^{49, 14}_2 ∧  b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨  b^{49, 14}_0 ∨  p_686 ∨ break
c  in DIMACS:
-16823 -16824  16825  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 14}_2 ∧ -b^{49, 14}_1 ∧ -b^{49, 14}_0 ∧ true) 
c  in CNF:
c    -b^{49, 14}_2 ∨  b^{49, 14}_1 ∨  b^{49, 14}_0 ∨ false 
c  in DIMACS:
-16823  16824  16825  0

c  3 does not represent an automaton state.
c    -(-b^{49, 14}_2 ∧  b^{49, 14}_1 ∧  b^{49, 14}_0 ∧ true) 
c  in CNF:
c     b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ false 
c  in DIMACS:
 16823 -16824 -16825  0
c  -3 does not represent an automaton state.
c    -( b^{49, 14}_2 ∧  b^{49, 14}_1 ∧  b^{49, 14}_0 ∧ true) 
c  in CNF:
c    -b^{49, 14}_2 ∨ -b^{49, 14}_1 ∨ -b^{49, 14}_0 ∨ false 
c  in DIMACS:
-16823 -16824 -16825  0

c i = 15
c  -2+1 --> -1
c    ( b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧  p_735) -> ( b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0)
c  in CNF:
c    -b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨  b^{49, 16}_2
c    -b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_1
c    -b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨  b^{49, 16}_0
c  in DIMACS:
-16826 -16827  16828 -735  16829 0
-16826 -16827  16828 -735 -16830 0
-16826 -16827  16828 -735  16831 0

c  -1+1 --> 0
c    ( b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0 ∧  p_735) -> (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧ -b^{49, 16}_0)
c  in CNF:
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_2
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_1
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_0
c  in DIMACS:
-16826  16827 -16828 -735 -16829 0
-16826  16827 -16828 -735 -16830 0
-16826  16827 -16828 -735 -16831 0

c  0+1 --> 1
c    (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧  p_735) -> (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0)
c  in CNF:
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_2
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_1
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨  b^{49, 16}_0
c  in DIMACS:
 16826  16827  16828 -735 -16829 0
 16826  16827  16828 -735 -16830 0
 16826  16827  16828 -735  16831 0

c  1+1 --> 2
c    (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0 ∧  p_735) -> (-b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0)
c  in CNF:
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_2
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨  b^{49, 16}_1
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ -p_735 ∨ -b^{49, 16}_0
c  in DIMACS:
 16826  16827 -16828 -735 -16829 0
 16826  16827 -16828 -735  16830 0
 16826  16827 -16828 -735 -16831 0

c  2+1 --> break 
c    (-b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧  p_735) -> break
c  in CNF:
c     b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 16826 -16827  16828 -735 1162 0


c  2-1 --> 1
c    (-b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧ -p_735) -> (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0)
c  in CNF:
c     b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_2
c     b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_1
c     b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨  b^{49, 16}_0
c  in DIMACS:
 16826 -16827  16828  735 -16829 0
 16826 -16827  16828  735 -16830 0
 16826 -16827  16828  735  16831 0

c  1-1 --> 0
c    (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0 ∧ -p_735) -> (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧ -b^{49, 16}_0)
c  in CNF:
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_2
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_1
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_0
c  in DIMACS:
 16826  16827 -16828  735 -16829 0
 16826  16827 -16828  735 -16830 0
 16826  16827 -16828  735 -16831 0

c  0-1 --> -1
c    (-b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧ -p_735) -> ( b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0)
c  in CNF:
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨  b^{49, 16}_2
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_1
c     b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨  b^{49, 16}_0
c  in DIMACS:
 16826  16827  16828  735  16829 0
 16826  16827  16828  735 -16830 0
 16826  16827  16828  735  16831 0

c  -1-1 --> -2
c    ( b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧  b^{49, 15}_0 ∧ -p_735) -> ( b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0)
c  in CNF:
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨  b^{49, 16}_2
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨  b^{49, 16}_1
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨  p_735 ∨ -b^{49, 16}_0
c  in DIMACS:
-16826  16827 -16828  735  16829 0
-16826  16827 -16828  735  16830 0
-16826  16827 -16828  735 -16831 0

c  -2-1 --> break 
c    ( b^{49, 15}_2 ∧  b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨  b^{49, 15}_0 ∨  p_735 ∨ break
c  in DIMACS:
-16826 -16827  16828  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 15}_2 ∧ -b^{49, 15}_1 ∧ -b^{49, 15}_0 ∧ true) 
c  in CNF:
c    -b^{49, 15}_2 ∨  b^{49, 15}_1 ∨  b^{49, 15}_0 ∨ false 
c  in DIMACS:
-16826  16827  16828  0

c  3 does not represent an automaton state.
c    -(-b^{49, 15}_2 ∧  b^{49, 15}_1 ∧  b^{49, 15}_0 ∧ true) 
c  in CNF:
c     b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ false 
c  in DIMACS:
 16826 -16827 -16828  0
c  -3 does not represent an automaton state.
c    -( b^{49, 15}_2 ∧  b^{49, 15}_1 ∧  b^{49, 15}_0 ∧ true) 
c  in CNF:
c    -b^{49, 15}_2 ∨ -b^{49, 15}_1 ∨ -b^{49, 15}_0 ∨ false 
c  in DIMACS:
-16826 -16827 -16828  0

c i = 16
c  -2+1 --> -1
c    ( b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧  p_784) -> ( b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0)
c  in CNF:
c    -b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨  b^{49, 17}_2
c    -b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_1
c    -b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨  b^{49, 17}_0
c  in DIMACS:
-16829 -16830  16831 -784  16832 0
-16829 -16830  16831 -784 -16833 0
-16829 -16830  16831 -784  16834 0

c  -1+1 --> 0
c    ( b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0 ∧  p_784) -> (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧ -b^{49, 17}_0)
c  in CNF:
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_2
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_1
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_0
c  in DIMACS:
-16829  16830 -16831 -784 -16832 0
-16829  16830 -16831 -784 -16833 0
-16829  16830 -16831 -784 -16834 0

c  0+1 --> 1
c    (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧  p_784) -> (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0)
c  in CNF:
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_2
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_1
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨  b^{49, 17}_0
c  in DIMACS:
 16829  16830  16831 -784 -16832 0
 16829  16830  16831 -784 -16833 0
 16829  16830  16831 -784  16834 0

c  1+1 --> 2
c    (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0 ∧  p_784) -> (-b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0)
c  in CNF:
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_2
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨  b^{49, 17}_1
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ -p_784 ∨ -b^{49, 17}_0
c  in DIMACS:
 16829  16830 -16831 -784 -16832 0
 16829  16830 -16831 -784  16833 0
 16829  16830 -16831 -784 -16834 0

c  2+1 --> break 
c    (-b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧  p_784) -> break
c  in CNF:
c     b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 16829 -16830  16831 -784 1162 0


c  2-1 --> 1
c    (-b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧ -p_784) -> (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0)
c  in CNF:
c     b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_2
c     b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_1
c     b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨  b^{49, 17}_0
c  in DIMACS:
 16829 -16830  16831  784 -16832 0
 16829 -16830  16831  784 -16833 0
 16829 -16830  16831  784  16834 0

c  1-1 --> 0
c    (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0 ∧ -p_784) -> (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧ -b^{49, 17}_0)
c  in CNF:
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_2
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_1
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_0
c  in DIMACS:
 16829  16830 -16831  784 -16832 0
 16829  16830 -16831  784 -16833 0
 16829  16830 -16831  784 -16834 0

c  0-1 --> -1
c    (-b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧ -p_784) -> ( b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0)
c  in CNF:
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨  b^{49, 17}_2
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_1
c     b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨  b^{49, 17}_0
c  in DIMACS:
 16829  16830  16831  784  16832 0
 16829  16830  16831  784 -16833 0
 16829  16830  16831  784  16834 0

c  -1-1 --> -2
c    ( b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧  b^{49, 16}_0 ∧ -p_784) -> ( b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0)
c  in CNF:
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨  b^{49, 17}_2
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨  b^{49, 17}_1
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨  p_784 ∨ -b^{49, 17}_0
c  in DIMACS:
-16829  16830 -16831  784  16832 0
-16829  16830 -16831  784  16833 0
-16829  16830 -16831  784 -16834 0

c  -2-1 --> break 
c    ( b^{49, 16}_2 ∧  b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨  b^{49, 16}_0 ∨  p_784 ∨ break
c  in DIMACS:
-16829 -16830  16831  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 16}_2 ∧ -b^{49, 16}_1 ∧ -b^{49, 16}_0 ∧ true) 
c  in CNF:
c    -b^{49, 16}_2 ∨  b^{49, 16}_1 ∨  b^{49, 16}_0 ∨ false 
c  in DIMACS:
-16829  16830  16831  0

c  3 does not represent an automaton state.
c    -(-b^{49, 16}_2 ∧  b^{49, 16}_1 ∧  b^{49, 16}_0 ∧ true) 
c  in CNF:
c     b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ false 
c  in DIMACS:
 16829 -16830 -16831  0
c  -3 does not represent an automaton state.
c    -( b^{49, 16}_2 ∧  b^{49, 16}_1 ∧  b^{49, 16}_0 ∧ true) 
c  in CNF:
c    -b^{49, 16}_2 ∨ -b^{49, 16}_1 ∨ -b^{49, 16}_0 ∨ false 
c  in DIMACS:
-16829 -16830 -16831  0

c i = 17
c  -2+1 --> -1
c    ( b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧  p_833) -> ( b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0)
c  in CNF:
c    -b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨  b^{49, 18}_2
c    -b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_1
c    -b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨  b^{49, 18}_0
c  in DIMACS:
-16832 -16833  16834 -833  16835 0
-16832 -16833  16834 -833 -16836 0
-16832 -16833  16834 -833  16837 0

c  -1+1 --> 0
c    ( b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0 ∧  p_833) -> (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧ -b^{49, 18}_0)
c  in CNF:
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_2
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_1
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_0
c  in DIMACS:
-16832  16833 -16834 -833 -16835 0
-16832  16833 -16834 -833 -16836 0
-16832  16833 -16834 -833 -16837 0

c  0+1 --> 1
c    (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧  p_833) -> (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0)
c  in CNF:
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_2
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_1
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨  b^{49, 18}_0
c  in DIMACS:
 16832  16833  16834 -833 -16835 0
 16832  16833  16834 -833 -16836 0
 16832  16833  16834 -833  16837 0

c  1+1 --> 2
c    (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0 ∧  p_833) -> (-b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0)
c  in CNF:
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_2
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨  b^{49, 18}_1
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ -p_833 ∨ -b^{49, 18}_0
c  in DIMACS:
 16832  16833 -16834 -833 -16835 0
 16832  16833 -16834 -833  16836 0
 16832  16833 -16834 -833 -16837 0

c  2+1 --> break 
c    (-b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧  p_833) -> break
c  in CNF:
c     b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ -p_833 ∨ break
c  in DIMACS:
 16832 -16833  16834 -833 1162 0


c  2-1 --> 1
c    (-b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧ -p_833) -> (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0)
c  in CNF:
c     b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_2
c     b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_1
c     b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨  b^{49, 18}_0
c  in DIMACS:
 16832 -16833  16834  833 -16835 0
 16832 -16833  16834  833 -16836 0
 16832 -16833  16834  833  16837 0

c  1-1 --> 0
c    (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0 ∧ -p_833) -> (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧ -b^{49, 18}_0)
c  in CNF:
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_2
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_1
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_0
c  in DIMACS:
 16832  16833 -16834  833 -16835 0
 16832  16833 -16834  833 -16836 0
 16832  16833 -16834  833 -16837 0

c  0-1 --> -1
c    (-b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧ -p_833) -> ( b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0)
c  in CNF:
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨  b^{49, 18}_2
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_1
c     b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨  b^{49, 18}_0
c  in DIMACS:
 16832  16833  16834  833  16835 0
 16832  16833  16834  833 -16836 0
 16832  16833  16834  833  16837 0

c  -1-1 --> -2
c    ( b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧  b^{49, 17}_0 ∧ -p_833) -> ( b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0)
c  in CNF:
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨  b^{49, 18}_2
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨  b^{49, 18}_1
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨  p_833 ∨ -b^{49, 18}_0
c  in DIMACS:
-16832  16833 -16834  833  16835 0
-16832  16833 -16834  833  16836 0
-16832  16833 -16834  833 -16837 0

c  -2-1 --> break 
c    ( b^{49, 17}_2 ∧  b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧ -p_833) -> break
c  in CNF:
c    -b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨  b^{49, 17}_0 ∨  p_833 ∨ break
c  in DIMACS:
-16832 -16833  16834  833 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 17}_2 ∧ -b^{49, 17}_1 ∧ -b^{49, 17}_0 ∧ true) 
c  in CNF:
c    -b^{49, 17}_2 ∨  b^{49, 17}_1 ∨  b^{49, 17}_0 ∨ false 
c  in DIMACS:
-16832  16833  16834  0

c  3 does not represent an automaton state.
c    -(-b^{49, 17}_2 ∧  b^{49, 17}_1 ∧  b^{49, 17}_0 ∧ true) 
c  in CNF:
c     b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ false 
c  in DIMACS:
 16832 -16833 -16834  0
c  -3 does not represent an automaton state.
c    -( b^{49, 17}_2 ∧  b^{49, 17}_1 ∧  b^{49, 17}_0 ∧ true) 
c  in CNF:
c    -b^{49, 17}_2 ∨ -b^{49, 17}_1 ∨ -b^{49, 17}_0 ∨ false 
c  in DIMACS:
-16832 -16833 -16834  0

c i = 18
c  -2+1 --> -1
c    ( b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧  p_882) -> ( b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0)
c  in CNF:
c    -b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨  b^{49, 19}_2
c    -b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_1
c    -b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨  b^{49, 19}_0
c  in DIMACS:
-16835 -16836  16837 -882  16838 0
-16835 -16836  16837 -882 -16839 0
-16835 -16836  16837 -882  16840 0

c  -1+1 --> 0
c    ( b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0 ∧  p_882) -> (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧ -b^{49, 19}_0)
c  in CNF:
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_2
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_1
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_0
c  in DIMACS:
-16835  16836 -16837 -882 -16838 0
-16835  16836 -16837 -882 -16839 0
-16835  16836 -16837 -882 -16840 0

c  0+1 --> 1
c    (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧  p_882) -> (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0)
c  in CNF:
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_2
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_1
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨  b^{49, 19}_0
c  in DIMACS:
 16835  16836  16837 -882 -16838 0
 16835  16836  16837 -882 -16839 0
 16835  16836  16837 -882  16840 0

c  1+1 --> 2
c    (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0 ∧  p_882) -> (-b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0)
c  in CNF:
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_2
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨  b^{49, 19}_1
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ -p_882 ∨ -b^{49, 19}_0
c  in DIMACS:
 16835  16836 -16837 -882 -16838 0
 16835  16836 -16837 -882  16839 0
 16835  16836 -16837 -882 -16840 0

c  2+1 --> break 
c    (-b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧  p_882) -> break
c  in CNF:
c     b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 16835 -16836  16837 -882 1162 0


c  2-1 --> 1
c    (-b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧ -p_882) -> (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0)
c  in CNF:
c     b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_2
c     b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_1
c     b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨  b^{49, 19}_0
c  in DIMACS:
 16835 -16836  16837  882 -16838 0
 16835 -16836  16837  882 -16839 0
 16835 -16836  16837  882  16840 0

c  1-1 --> 0
c    (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0 ∧ -p_882) -> (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧ -b^{49, 19}_0)
c  in CNF:
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_2
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_1
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_0
c  in DIMACS:
 16835  16836 -16837  882 -16838 0
 16835  16836 -16837  882 -16839 0
 16835  16836 -16837  882 -16840 0

c  0-1 --> -1
c    (-b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧ -p_882) -> ( b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0)
c  in CNF:
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨  b^{49, 19}_2
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_1
c     b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨  b^{49, 19}_0
c  in DIMACS:
 16835  16836  16837  882  16838 0
 16835  16836  16837  882 -16839 0
 16835  16836  16837  882  16840 0

c  -1-1 --> -2
c    ( b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧  b^{49, 18}_0 ∧ -p_882) -> ( b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0)
c  in CNF:
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨  b^{49, 19}_2
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨  b^{49, 19}_1
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨  p_882 ∨ -b^{49, 19}_0
c  in DIMACS:
-16835  16836 -16837  882  16838 0
-16835  16836 -16837  882  16839 0
-16835  16836 -16837  882 -16840 0

c  -2-1 --> break 
c    ( b^{49, 18}_2 ∧  b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨  b^{49, 18}_0 ∨  p_882 ∨ break
c  in DIMACS:
-16835 -16836  16837  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 18}_2 ∧ -b^{49, 18}_1 ∧ -b^{49, 18}_0 ∧ true) 
c  in CNF:
c    -b^{49, 18}_2 ∨  b^{49, 18}_1 ∨  b^{49, 18}_0 ∨ false 
c  in DIMACS:
-16835  16836  16837  0

c  3 does not represent an automaton state.
c    -(-b^{49, 18}_2 ∧  b^{49, 18}_1 ∧  b^{49, 18}_0 ∧ true) 
c  in CNF:
c     b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ false 
c  in DIMACS:
 16835 -16836 -16837  0
c  -3 does not represent an automaton state.
c    -( b^{49, 18}_2 ∧  b^{49, 18}_1 ∧  b^{49, 18}_0 ∧ true) 
c  in CNF:
c    -b^{49, 18}_2 ∨ -b^{49, 18}_1 ∨ -b^{49, 18}_0 ∨ false 
c  in DIMACS:
-16835 -16836 -16837  0

c i = 19
c  -2+1 --> -1
c    ( b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧  p_931) -> ( b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0)
c  in CNF:
c    -b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨  b^{49, 20}_2
c    -b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_1
c    -b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨  b^{49, 20}_0
c  in DIMACS:
-16838 -16839  16840 -931  16841 0
-16838 -16839  16840 -931 -16842 0
-16838 -16839  16840 -931  16843 0

c  -1+1 --> 0
c    ( b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0 ∧  p_931) -> (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧ -b^{49, 20}_0)
c  in CNF:
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_2
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_1
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_0
c  in DIMACS:
-16838  16839 -16840 -931 -16841 0
-16838  16839 -16840 -931 -16842 0
-16838  16839 -16840 -931 -16843 0

c  0+1 --> 1
c    (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧  p_931) -> (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0)
c  in CNF:
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_2
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_1
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨  b^{49, 20}_0
c  in DIMACS:
 16838  16839  16840 -931 -16841 0
 16838  16839  16840 -931 -16842 0
 16838  16839  16840 -931  16843 0

c  1+1 --> 2
c    (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0 ∧  p_931) -> (-b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0)
c  in CNF:
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_2
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨  b^{49, 20}_1
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ -p_931 ∨ -b^{49, 20}_0
c  in DIMACS:
 16838  16839 -16840 -931 -16841 0
 16838  16839 -16840 -931  16842 0
 16838  16839 -16840 -931 -16843 0

c  2+1 --> break 
c    (-b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧  p_931) -> break
c  in CNF:
c     b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ -p_931 ∨ break
c  in DIMACS:
 16838 -16839  16840 -931 1162 0


c  2-1 --> 1
c    (-b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧ -p_931) -> (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0)
c  in CNF:
c     b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_2
c     b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_1
c     b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨  b^{49, 20}_0
c  in DIMACS:
 16838 -16839  16840  931 -16841 0
 16838 -16839  16840  931 -16842 0
 16838 -16839  16840  931  16843 0

c  1-1 --> 0
c    (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0 ∧ -p_931) -> (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧ -b^{49, 20}_0)
c  in CNF:
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_2
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_1
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_0
c  in DIMACS:
 16838  16839 -16840  931 -16841 0
 16838  16839 -16840  931 -16842 0
 16838  16839 -16840  931 -16843 0

c  0-1 --> -1
c    (-b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧ -p_931) -> ( b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0)
c  in CNF:
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨  b^{49, 20}_2
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_1
c     b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨  b^{49, 20}_0
c  in DIMACS:
 16838  16839  16840  931  16841 0
 16838  16839  16840  931 -16842 0
 16838  16839  16840  931  16843 0

c  -1-1 --> -2
c    ( b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧  b^{49, 19}_0 ∧ -p_931) -> ( b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0)
c  in CNF:
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨  b^{49, 20}_2
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨  b^{49, 20}_1
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨  p_931 ∨ -b^{49, 20}_0
c  in DIMACS:
-16838  16839 -16840  931  16841 0
-16838  16839 -16840  931  16842 0
-16838  16839 -16840  931 -16843 0

c  -2-1 --> break 
c    ( b^{49, 19}_2 ∧  b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧ -p_931) -> break
c  in CNF:
c    -b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨  b^{49, 19}_0 ∨  p_931 ∨ break
c  in DIMACS:
-16838 -16839  16840  931 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 19}_2 ∧ -b^{49, 19}_1 ∧ -b^{49, 19}_0 ∧ true) 
c  in CNF:
c    -b^{49, 19}_2 ∨  b^{49, 19}_1 ∨  b^{49, 19}_0 ∨ false 
c  in DIMACS:
-16838  16839  16840  0

c  3 does not represent an automaton state.
c    -(-b^{49, 19}_2 ∧  b^{49, 19}_1 ∧  b^{49, 19}_0 ∧ true) 
c  in CNF:
c     b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ false 
c  in DIMACS:
 16838 -16839 -16840  0
c  -3 does not represent an automaton state.
c    -( b^{49, 19}_2 ∧  b^{49, 19}_1 ∧  b^{49, 19}_0 ∧ true) 
c  in CNF:
c    -b^{49, 19}_2 ∨ -b^{49, 19}_1 ∨ -b^{49, 19}_0 ∨ false 
c  in DIMACS:
-16838 -16839 -16840  0

c i = 20
c  -2+1 --> -1
c    ( b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧  p_980) -> ( b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0)
c  in CNF:
c    -b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨  b^{49, 21}_2
c    -b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_1
c    -b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨  b^{49, 21}_0
c  in DIMACS:
-16841 -16842  16843 -980  16844 0
-16841 -16842  16843 -980 -16845 0
-16841 -16842  16843 -980  16846 0

c  -1+1 --> 0
c    ( b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0 ∧  p_980) -> (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧ -b^{49, 21}_0)
c  in CNF:
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_2
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_1
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_0
c  in DIMACS:
-16841  16842 -16843 -980 -16844 0
-16841  16842 -16843 -980 -16845 0
-16841  16842 -16843 -980 -16846 0

c  0+1 --> 1
c    (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧  p_980) -> (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0)
c  in CNF:
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_2
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_1
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨  b^{49, 21}_0
c  in DIMACS:
 16841  16842  16843 -980 -16844 0
 16841  16842  16843 -980 -16845 0
 16841  16842  16843 -980  16846 0

c  1+1 --> 2
c    (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0 ∧  p_980) -> (-b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0)
c  in CNF:
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_2
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨  b^{49, 21}_1
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ -p_980 ∨ -b^{49, 21}_0
c  in DIMACS:
 16841  16842 -16843 -980 -16844 0
 16841  16842 -16843 -980  16845 0
 16841  16842 -16843 -980 -16846 0

c  2+1 --> break 
c    (-b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧  p_980) -> break
c  in CNF:
c     b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 16841 -16842  16843 -980 1162 0


c  2-1 --> 1
c    (-b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧ -p_980) -> (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0)
c  in CNF:
c     b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_2
c     b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_1
c     b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨  b^{49, 21}_0
c  in DIMACS:
 16841 -16842  16843  980 -16844 0
 16841 -16842  16843  980 -16845 0
 16841 -16842  16843  980  16846 0

c  1-1 --> 0
c    (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0 ∧ -p_980) -> (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧ -b^{49, 21}_0)
c  in CNF:
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_2
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_1
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_0
c  in DIMACS:
 16841  16842 -16843  980 -16844 0
 16841  16842 -16843  980 -16845 0
 16841  16842 -16843  980 -16846 0

c  0-1 --> -1
c    (-b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧ -p_980) -> ( b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0)
c  in CNF:
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨  b^{49, 21}_2
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_1
c     b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨  b^{49, 21}_0
c  in DIMACS:
 16841  16842  16843  980  16844 0
 16841  16842  16843  980 -16845 0
 16841  16842  16843  980  16846 0

c  -1-1 --> -2
c    ( b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧  b^{49, 20}_0 ∧ -p_980) -> ( b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0)
c  in CNF:
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨  b^{49, 21}_2
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨  b^{49, 21}_1
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨  p_980 ∨ -b^{49, 21}_0
c  in DIMACS:
-16841  16842 -16843  980  16844 0
-16841  16842 -16843  980  16845 0
-16841  16842 -16843  980 -16846 0

c  -2-1 --> break 
c    ( b^{49, 20}_2 ∧  b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨  b^{49, 20}_0 ∨  p_980 ∨ break
c  in DIMACS:
-16841 -16842  16843  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 20}_2 ∧ -b^{49, 20}_1 ∧ -b^{49, 20}_0 ∧ true) 
c  in CNF:
c    -b^{49, 20}_2 ∨  b^{49, 20}_1 ∨  b^{49, 20}_0 ∨ false 
c  in DIMACS:
-16841  16842  16843  0

c  3 does not represent an automaton state.
c    -(-b^{49, 20}_2 ∧  b^{49, 20}_1 ∧  b^{49, 20}_0 ∧ true) 
c  in CNF:
c     b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ false 
c  in DIMACS:
 16841 -16842 -16843  0
c  -3 does not represent an automaton state.
c    -( b^{49, 20}_2 ∧  b^{49, 20}_1 ∧  b^{49, 20}_0 ∧ true) 
c  in CNF:
c    -b^{49, 20}_2 ∨ -b^{49, 20}_1 ∨ -b^{49, 20}_0 ∨ false 
c  in DIMACS:
-16841 -16842 -16843  0

c i = 21
c  -2+1 --> -1
c    ( b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧  p_1029) -> ( b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0)
c  in CNF:
c    -b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨  b^{49, 22}_2
c    -b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_1
c    -b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨  b^{49, 22}_0
c  in DIMACS:
-16844 -16845  16846 -1029  16847 0
-16844 -16845  16846 -1029 -16848 0
-16844 -16845  16846 -1029  16849 0

c  -1+1 --> 0
c    ( b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0 ∧  p_1029) -> (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧ -b^{49, 22}_0)
c  in CNF:
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_2
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_1
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_0
c  in DIMACS:
-16844  16845 -16846 -1029 -16847 0
-16844  16845 -16846 -1029 -16848 0
-16844  16845 -16846 -1029 -16849 0

c  0+1 --> 1
c    (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧  p_1029) -> (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0)
c  in CNF:
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_2
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_1
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨  b^{49, 22}_0
c  in DIMACS:
 16844  16845  16846 -1029 -16847 0
 16844  16845  16846 -1029 -16848 0
 16844  16845  16846 -1029  16849 0

c  1+1 --> 2
c    (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0 ∧  p_1029) -> (-b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0)
c  in CNF:
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_2
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨  b^{49, 22}_1
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ -p_1029 ∨ -b^{49, 22}_0
c  in DIMACS:
 16844  16845 -16846 -1029 -16847 0
 16844  16845 -16846 -1029  16848 0
 16844  16845 -16846 -1029 -16849 0

c  2+1 --> break 
c    (-b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 16844 -16845  16846 -1029 1162 0


c  2-1 --> 1
c    (-b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧ -p_1029) -> (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0)
c  in CNF:
c     b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_2
c     b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_1
c     b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨  b^{49, 22}_0
c  in DIMACS:
 16844 -16845  16846  1029 -16847 0
 16844 -16845  16846  1029 -16848 0
 16844 -16845  16846  1029  16849 0

c  1-1 --> 0
c    (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0 ∧ -p_1029) -> (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧ -b^{49, 22}_0)
c  in CNF:
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_2
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_1
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_0
c  in DIMACS:
 16844  16845 -16846  1029 -16847 0
 16844  16845 -16846  1029 -16848 0
 16844  16845 -16846  1029 -16849 0

c  0-1 --> -1
c    (-b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧ -p_1029) -> ( b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0)
c  in CNF:
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨  b^{49, 22}_2
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_1
c     b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨  b^{49, 22}_0
c  in DIMACS:
 16844  16845  16846  1029  16847 0
 16844  16845  16846  1029 -16848 0
 16844  16845  16846  1029  16849 0

c  -1-1 --> -2
c    ( b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧  b^{49, 21}_0 ∧ -p_1029) -> ( b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0)
c  in CNF:
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨  b^{49, 22}_2
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨  b^{49, 22}_1
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨  p_1029 ∨ -b^{49, 22}_0
c  in DIMACS:
-16844  16845 -16846  1029  16847 0
-16844  16845 -16846  1029  16848 0
-16844  16845 -16846  1029 -16849 0

c  -2-1 --> break 
c    ( b^{49, 21}_2 ∧  b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨  b^{49, 21}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-16844 -16845  16846  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 21}_2 ∧ -b^{49, 21}_1 ∧ -b^{49, 21}_0 ∧ true) 
c  in CNF:
c    -b^{49, 21}_2 ∨  b^{49, 21}_1 ∨  b^{49, 21}_0 ∨ false 
c  in DIMACS:
-16844  16845  16846  0

c  3 does not represent an automaton state.
c    -(-b^{49, 21}_2 ∧  b^{49, 21}_1 ∧  b^{49, 21}_0 ∧ true) 
c  in CNF:
c     b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ false 
c  in DIMACS:
 16844 -16845 -16846  0
c  -3 does not represent an automaton state.
c    -( b^{49, 21}_2 ∧  b^{49, 21}_1 ∧  b^{49, 21}_0 ∧ true) 
c  in CNF:
c    -b^{49, 21}_2 ∨ -b^{49, 21}_1 ∨ -b^{49, 21}_0 ∨ false 
c  in DIMACS:
-16844 -16845 -16846  0

c i = 22
c  -2+1 --> -1
c    ( b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧  p_1078) -> ( b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0)
c  in CNF:
c    -b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨  b^{49, 23}_2
c    -b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_1
c    -b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨  b^{49, 23}_0
c  in DIMACS:
-16847 -16848  16849 -1078  16850 0
-16847 -16848  16849 -1078 -16851 0
-16847 -16848  16849 -1078  16852 0

c  -1+1 --> 0
c    ( b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0 ∧  p_1078) -> (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧ -b^{49, 23}_0)
c  in CNF:
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_2
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_1
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_0
c  in DIMACS:
-16847  16848 -16849 -1078 -16850 0
-16847  16848 -16849 -1078 -16851 0
-16847  16848 -16849 -1078 -16852 0

c  0+1 --> 1
c    (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧  p_1078) -> (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0)
c  in CNF:
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_2
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_1
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨  b^{49, 23}_0
c  in DIMACS:
 16847  16848  16849 -1078 -16850 0
 16847  16848  16849 -1078 -16851 0
 16847  16848  16849 -1078  16852 0

c  1+1 --> 2
c    (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0 ∧  p_1078) -> (-b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0)
c  in CNF:
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_2
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨  b^{49, 23}_1
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ -p_1078 ∨ -b^{49, 23}_0
c  in DIMACS:
 16847  16848 -16849 -1078 -16850 0
 16847  16848 -16849 -1078  16851 0
 16847  16848 -16849 -1078 -16852 0

c  2+1 --> break 
c    (-b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 16847 -16848  16849 -1078 1162 0


c  2-1 --> 1
c    (-b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧ -p_1078) -> (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0)
c  in CNF:
c     b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_2
c     b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_1
c     b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨  b^{49, 23}_0
c  in DIMACS:
 16847 -16848  16849  1078 -16850 0
 16847 -16848  16849  1078 -16851 0
 16847 -16848  16849  1078  16852 0

c  1-1 --> 0
c    (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0 ∧ -p_1078) -> (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧ -b^{49, 23}_0)
c  in CNF:
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_2
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_1
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_0
c  in DIMACS:
 16847  16848 -16849  1078 -16850 0
 16847  16848 -16849  1078 -16851 0
 16847  16848 -16849  1078 -16852 0

c  0-1 --> -1
c    (-b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧ -p_1078) -> ( b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0)
c  in CNF:
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨  b^{49, 23}_2
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_1
c     b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨  b^{49, 23}_0
c  in DIMACS:
 16847  16848  16849  1078  16850 0
 16847  16848  16849  1078 -16851 0
 16847  16848  16849  1078  16852 0

c  -1-1 --> -2
c    ( b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧  b^{49, 22}_0 ∧ -p_1078) -> ( b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0)
c  in CNF:
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨  b^{49, 23}_2
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨  b^{49, 23}_1
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨  p_1078 ∨ -b^{49, 23}_0
c  in DIMACS:
-16847  16848 -16849  1078  16850 0
-16847  16848 -16849  1078  16851 0
-16847  16848 -16849  1078 -16852 0

c  -2-1 --> break 
c    ( b^{49, 22}_2 ∧  b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨  b^{49, 22}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-16847 -16848  16849  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 22}_2 ∧ -b^{49, 22}_1 ∧ -b^{49, 22}_0 ∧ true) 
c  in CNF:
c    -b^{49, 22}_2 ∨  b^{49, 22}_1 ∨  b^{49, 22}_0 ∨ false 
c  in DIMACS:
-16847  16848  16849  0

c  3 does not represent an automaton state.
c    -(-b^{49, 22}_2 ∧  b^{49, 22}_1 ∧  b^{49, 22}_0 ∧ true) 
c  in CNF:
c     b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ false 
c  in DIMACS:
 16847 -16848 -16849  0
c  -3 does not represent an automaton state.
c    -( b^{49, 22}_2 ∧  b^{49, 22}_1 ∧  b^{49, 22}_0 ∧ true) 
c  in CNF:
c    -b^{49, 22}_2 ∨ -b^{49, 22}_1 ∨ -b^{49, 22}_0 ∨ false 
c  in DIMACS:
-16847 -16848 -16849  0

c i = 23
c  -2+1 --> -1
c    ( b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧  p_1127) -> ( b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧  b^{49, 24}_0)
c  in CNF:
c    -b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨  b^{49, 24}_2
c    -b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_1
c    -b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨  b^{49, 24}_0
c  in DIMACS:
-16850 -16851  16852 -1127  16853 0
-16850 -16851  16852 -1127 -16854 0
-16850 -16851  16852 -1127  16855 0

c  -1+1 --> 0
c    ( b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0 ∧  p_1127) -> (-b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧ -b^{49, 24}_0)
c  in CNF:
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_2
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_1
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_0
c  in DIMACS:
-16850  16851 -16852 -1127 -16853 0
-16850  16851 -16852 -1127 -16854 0
-16850  16851 -16852 -1127 -16855 0

c  0+1 --> 1
c    (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧  p_1127) -> (-b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧  b^{49, 24}_0)
c  in CNF:
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_2
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_1
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨  b^{49, 24}_0
c  in DIMACS:
 16850  16851  16852 -1127 -16853 0
 16850  16851  16852 -1127 -16854 0
 16850  16851  16852 -1127  16855 0

c  1+1 --> 2
c    (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0 ∧  p_1127) -> (-b^{49, 24}_2 ∧  b^{49, 24}_1 ∧ -b^{49, 24}_0)
c  in CNF:
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_2
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨  b^{49, 24}_1
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ -p_1127 ∨ -b^{49, 24}_0
c  in DIMACS:
 16850  16851 -16852 -1127 -16853 0
 16850  16851 -16852 -1127  16854 0
 16850  16851 -16852 -1127 -16855 0

c  2+1 --> break 
c    (-b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧  p_1127) -> break
c  in CNF:
c     b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ -p_1127 ∨ break
c  in DIMACS:
 16850 -16851  16852 -1127 1162 0


c  2-1 --> 1
c    (-b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧ -p_1127) -> (-b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧  b^{49, 24}_0)
c  in CNF:
c     b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_2
c     b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_1
c     b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨  b^{49, 24}_0
c  in DIMACS:
 16850 -16851  16852  1127 -16853 0
 16850 -16851  16852  1127 -16854 0
 16850 -16851  16852  1127  16855 0

c  1-1 --> 0
c    (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0 ∧ -p_1127) -> (-b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧ -b^{49, 24}_0)
c  in CNF:
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_2
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_1
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_0
c  in DIMACS:
 16850  16851 -16852  1127 -16853 0
 16850  16851 -16852  1127 -16854 0
 16850  16851 -16852  1127 -16855 0

c  0-1 --> -1
c    (-b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧ -p_1127) -> ( b^{49, 24}_2 ∧ -b^{49, 24}_1 ∧  b^{49, 24}_0)
c  in CNF:
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨  b^{49, 24}_2
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_1
c     b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨  b^{49, 24}_0
c  in DIMACS:
 16850  16851  16852  1127  16853 0
 16850  16851  16852  1127 -16854 0
 16850  16851  16852  1127  16855 0

c  -1-1 --> -2
c    ( b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧  b^{49, 23}_0 ∧ -p_1127) -> ( b^{49, 24}_2 ∧  b^{49, 24}_1 ∧ -b^{49, 24}_0)
c  in CNF:
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨  b^{49, 24}_2
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨  b^{49, 24}_1
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨  p_1127 ∨ -b^{49, 24}_0
c  in DIMACS:
-16850  16851 -16852  1127  16853 0
-16850  16851 -16852  1127  16854 0
-16850  16851 -16852  1127 -16855 0

c  -2-1 --> break 
c    ( b^{49, 23}_2 ∧  b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧ -p_1127) -> break
c  in CNF:
c    -b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨  b^{49, 23}_0 ∨  p_1127 ∨ break
c  in DIMACS:
-16850 -16851  16852  1127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{49, 23}_2 ∧ -b^{49, 23}_1 ∧ -b^{49, 23}_0 ∧ true) 
c  in CNF:
c    -b^{49, 23}_2 ∨  b^{49, 23}_1 ∨  b^{49, 23}_0 ∨ false 
c  in DIMACS:
-16850  16851  16852  0

c  3 does not represent an automaton state.
c    -(-b^{49, 23}_2 ∧  b^{49, 23}_1 ∧  b^{49, 23}_0 ∧ true) 
c  in CNF:
c     b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ false 
c  in DIMACS:
 16850 -16851 -16852  0
c  -3 does not represent an automaton state.
c    -( b^{49, 23}_2 ∧  b^{49, 23}_1 ∧  b^{49, 23}_0 ∧ true) 
c  in CNF:
c    -b^{49, 23}_2 ∨ -b^{49, 23}_1 ∨ -b^{49, 23}_0 ∨ false 
c  in DIMACS:
-16850 -16851 -16852  0

c INIT for k = 50
c    -b^{50, 1}_2
c    -b^{50, 1}_1
c    -b^{50, 1}_0
c  in DIMACS:
-16856 0
-16857 0
-16858 0

c Transitions for k = 50
c i = 1
c  -2+1 --> -1
c    ( b^{50, 1}_2 ∧  b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧  p_50) -> ( b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0)
c  in CNF:
c    -b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨  b^{50, 2}_2
c    -b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_1
c    -b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨  b^{50, 2}_0
c  in DIMACS:
-16856 -16857  16858 -50  16859 0
-16856 -16857  16858 -50 -16860 0
-16856 -16857  16858 -50  16861 0

c  -1+1 --> 0
c    ( b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧  b^{50, 1}_0 ∧  p_50) -> (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧ -b^{50, 2}_0)
c  in CNF:
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_2
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_1
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_0
c  in DIMACS:
-16856  16857 -16858 -50 -16859 0
-16856  16857 -16858 -50 -16860 0
-16856  16857 -16858 -50 -16861 0

c  0+1 --> 1
c    (-b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧  p_50) -> (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0)
c  in CNF:
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_2
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_1
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨  b^{50, 2}_0
c  in DIMACS:
 16856  16857  16858 -50 -16859 0
 16856  16857  16858 -50 -16860 0
 16856  16857  16858 -50  16861 0

c  1+1 --> 2
c    (-b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧  b^{50, 1}_0 ∧  p_50) -> (-b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0)
c  in CNF:
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_2
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨  b^{50, 2}_1
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ -p_50 ∨ -b^{50, 2}_0
c  in DIMACS:
 16856  16857 -16858 -50 -16859 0
 16856  16857 -16858 -50  16860 0
 16856  16857 -16858 -50 -16861 0

c  2+1 --> break 
c    (-b^{50, 1}_2 ∧  b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧  p_50) -> break
c  in CNF:
c     b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ -p_50 ∨ break
c  in DIMACS:
 16856 -16857  16858 -50 1162 0


c  2-1 --> 1
c    (-b^{50, 1}_2 ∧  b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧ -p_50) -> (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0)
c  in CNF:
c     b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_2
c     b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_1
c     b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨  b^{50, 2}_0
c  in DIMACS:
 16856 -16857  16858  50 -16859 0
 16856 -16857  16858  50 -16860 0
 16856 -16857  16858  50  16861 0

c  1-1 --> 0
c    (-b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧  b^{50, 1}_0 ∧ -p_50) -> (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧ -b^{50, 2}_0)
c  in CNF:
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_2
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_1
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_0
c  in DIMACS:
 16856  16857 -16858  50 -16859 0
 16856  16857 -16858  50 -16860 0
 16856  16857 -16858  50 -16861 0

c  0-1 --> -1
c    (-b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧ -p_50) -> ( b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0)
c  in CNF:
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨  b^{50, 2}_2
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_1
c     b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨  b^{50, 2}_0
c  in DIMACS:
 16856  16857  16858  50  16859 0
 16856  16857  16858  50 -16860 0
 16856  16857  16858  50  16861 0

c  -1-1 --> -2
c    ( b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧  b^{50, 1}_0 ∧ -p_50) -> ( b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0)
c  in CNF:
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨  b^{50, 2}_2
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨  b^{50, 2}_1
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨  p_50 ∨ -b^{50, 2}_0
c  in DIMACS:
-16856  16857 -16858  50  16859 0
-16856  16857 -16858  50  16860 0
-16856  16857 -16858  50 -16861 0

c  -2-1 --> break 
c    ( b^{50, 1}_2 ∧  b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧ -p_50) -> break
c  in CNF:
c    -b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨  b^{50, 1}_0 ∨  p_50 ∨ break
c  in DIMACS:
-16856 -16857  16858  50 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 1}_2 ∧ -b^{50, 1}_1 ∧ -b^{50, 1}_0 ∧ true) 
c  in CNF:
c    -b^{50, 1}_2 ∨  b^{50, 1}_1 ∨  b^{50, 1}_0 ∨ false 
c  in DIMACS:
-16856  16857  16858  0

c  3 does not represent an automaton state.
c    -(-b^{50, 1}_2 ∧  b^{50, 1}_1 ∧  b^{50, 1}_0 ∧ true) 
c  in CNF:
c     b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ false 
c  in DIMACS:
 16856 -16857 -16858  0
c  -3 does not represent an automaton state.
c    -( b^{50, 1}_2 ∧  b^{50, 1}_1 ∧  b^{50, 1}_0 ∧ true) 
c  in CNF:
c    -b^{50, 1}_2 ∨ -b^{50, 1}_1 ∨ -b^{50, 1}_0 ∨ false 
c  in DIMACS:
-16856 -16857 -16858  0

c i = 2
c  -2+1 --> -1
c    ( b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧  p_100) -> ( b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0)
c  in CNF:
c    -b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨  b^{50, 3}_2
c    -b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_1
c    -b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨  b^{50, 3}_0
c  in DIMACS:
-16859 -16860  16861 -100  16862 0
-16859 -16860  16861 -100 -16863 0
-16859 -16860  16861 -100  16864 0

c  -1+1 --> 0
c    ( b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0 ∧  p_100) -> (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧ -b^{50, 3}_0)
c  in CNF:
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_2
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_1
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_0
c  in DIMACS:
-16859  16860 -16861 -100 -16862 0
-16859  16860 -16861 -100 -16863 0
-16859  16860 -16861 -100 -16864 0

c  0+1 --> 1
c    (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧  p_100) -> (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0)
c  in CNF:
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_2
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_1
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨  b^{50, 3}_0
c  in DIMACS:
 16859  16860  16861 -100 -16862 0
 16859  16860  16861 -100 -16863 0
 16859  16860  16861 -100  16864 0

c  1+1 --> 2
c    (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0 ∧  p_100) -> (-b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0)
c  in CNF:
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_2
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨  b^{50, 3}_1
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ -p_100 ∨ -b^{50, 3}_0
c  in DIMACS:
 16859  16860 -16861 -100 -16862 0
 16859  16860 -16861 -100  16863 0
 16859  16860 -16861 -100 -16864 0

c  2+1 --> break 
c    (-b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧  p_100) -> break
c  in CNF:
c     b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 16859 -16860  16861 -100 1162 0


c  2-1 --> 1
c    (-b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧ -p_100) -> (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0)
c  in CNF:
c     b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_2
c     b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_1
c     b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨  b^{50, 3}_0
c  in DIMACS:
 16859 -16860  16861  100 -16862 0
 16859 -16860  16861  100 -16863 0
 16859 -16860  16861  100  16864 0

c  1-1 --> 0
c    (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0 ∧ -p_100) -> (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧ -b^{50, 3}_0)
c  in CNF:
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_2
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_1
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_0
c  in DIMACS:
 16859  16860 -16861  100 -16862 0
 16859  16860 -16861  100 -16863 0
 16859  16860 -16861  100 -16864 0

c  0-1 --> -1
c    (-b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧ -p_100) -> ( b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0)
c  in CNF:
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨  b^{50, 3}_2
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_1
c     b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨  b^{50, 3}_0
c  in DIMACS:
 16859  16860  16861  100  16862 0
 16859  16860  16861  100 -16863 0
 16859  16860  16861  100  16864 0

c  -1-1 --> -2
c    ( b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧  b^{50, 2}_0 ∧ -p_100) -> ( b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0)
c  in CNF:
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨  b^{50, 3}_2
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨  b^{50, 3}_1
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨  p_100 ∨ -b^{50, 3}_0
c  in DIMACS:
-16859  16860 -16861  100  16862 0
-16859  16860 -16861  100  16863 0
-16859  16860 -16861  100 -16864 0

c  -2-1 --> break 
c    ( b^{50, 2}_2 ∧  b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨  b^{50, 2}_0 ∨  p_100 ∨ break
c  in DIMACS:
-16859 -16860  16861  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 2}_2 ∧ -b^{50, 2}_1 ∧ -b^{50, 2}_0 ∧ true) 
c  in CNF:
c    -b^{50, 2}_2 ∨  b^{50, 2}_1 ∨  b^{50, 2}_0 ∨ false 
c  in DIMACS:
-16859  16860  16861  0

c  3 does not represent an automaton state.
c    -(-b^{50, 2}_2 ∧  b^{50, 2}_1 ∧  b^{50, 2}_0 ∧ true) 
c  in CNF:
c     b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ false 
c  in DIMACS:
 16859 -16860 -16861  0
c  -3 does not represent an automaton state.
c    -( b^{50, 2}_2 ∧  b^{50, 2}_1 ∧  b^{50, 2}_0 ∧ true) 
c  in CNF:
c    -b^{50, 2}_2 ∨ -b^{50, 2}_1 ∨ -b^{50, 2}_0 ∨ false 
c  in DIMACS:
-16859 -16860 -16861  0

c i = 3
c  -2+1 --> -1
c    ( b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧  p_150) -> ( b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0)
c  in CNF:
c    -b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨  b^{50, 4}_2
c    -b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_1
c    -b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨  b^{50, 4}_0
c  in DIMACS:
-16862 -16863  16864 -150  16865 0
-16862 -16863  16864 -150 -16866 0
-16862 -16863  16864 -150  16867 0

c  -1+1 --> 0
c    ( b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0 ∧  p_150) -> (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧ -b^{50, 4}_0)
c  in CNF:
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_2
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_1
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_0
c  in DIMACS:
-16862  16863 -16864 -150 -16865 0
-16862  16863 -16864 -150 -16866 0
-16862  16863 -16864 -150 -16867 0

c  0+1 --> 1
c    (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧  p_150) -> (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0)
c  in CNF:
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_2
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_1
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨  b^{50, 4}_0
c  in DIMACS:
 16862  16863  16864 -150 -16865 0
 16862  16863  16864 -150 -16866 0
 16862  16863  16864 -150  16867 0

c  1+1 --> 2
c    (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0 ∧  p_150) -> (-b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0)
c  in CNF:
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_2
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨  b^{50, 4}_1
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ -p_150 ∨ -b^{50, 4}_0
c  in DIMACS:
 16862  16863 -16864 -150 -16865 0
 16862  16863 -16864 -150  16866 0
 16862  16863 -16864 -150 -16867 0

c  2+1 --> break 
c    (-b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧  p_150) -> break
c  in CNF:
c     b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 16862 -16863  16864 -150 1162 0


c  2-1 --> 1
c    (-b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧ -p_150) -> (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0)
c  in CNF:
c     b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_2
c     b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_1
c     b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨  b^{50, 4}_0
c  in DIMACS:
 16862 -16863  16864  150 -16865 0
 16862 -16863  16864  150 -16866 0
 16862 -16863  16864  150  16867 0

c  1-1 --> 0
c    (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0 ∧ -p_150) -> (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧ -b^{50, 4}_0)
c  in CNF:
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_2
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_1
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_0
c  in DIMACS:
 16862  16863 -16864  150 -16865 0
 16862  16863 -16864  150 -16866 0
 16862  16863 -16864  150 -16867 0

c  0-1 --> -1
c    (-b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧ -p_150) -> ( b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0)
c  in CNF:
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨  b^{50, 4}_2
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_1
c     b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨  b^{50, 4}_0
c  in DIMACS:
 16862  16863  16864  150  16865 0
 16862  16863  16864  150 -16866 0
 16862  16863  16864  150  16867 0

c  -1-1 --> -2
c    ( b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧  b^{50, 3}_0 ∧ -p_150) -> ( b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0)
c  in CNF:
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨  b^{50, 4}_2
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨  b^{50, 4}_1
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨  p_150 ∨ -b^{50, 4}_0
c  in DIMACS:
-16862  16863 -16864  150  16865 0
-16862  16863 -16864  150  16866 0
-16862  16863 -16864  150 -16867 0

c  -2-1 --> break 
c    ( b^{50, 3}_2 ∧  b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨  b^{50, 3}_0 ∨  p_150 ∨ break
c  in DIMACS:
-16862 -16863  16864  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 3}_2 ∧ -b^{50, 3}_1 ∧ -b^{50, 3}_0 ∧ true) 
c  in CNF:
c    -b^{50, 3}_2 ∨  b^{50, 3}_1 ∨  b^{50, 3}_0 ∨ false 
c  in DIMACS:
-16862  16863  16864  0

c  3 does not represent an automaton state.
c    -(-b^{50, 3}_2 ∧  b^{50, 3}_1 ∧  b^{50, 3}_0 ∧ true) 
c  in CNF:
c     b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ false 
c  in DIMACS:
 16862 -16863 -16864  0
c  -3 does not represent an automaton state.
c    -( b^{50, 3}_2 ∧  b^{50, 3}_1 ∧  b^{50, 3}_0 ∧ true) 
c  in CNF:
c    -b^{50, 3}_2 ∨ -b^{50, 3}_1 ∨ -b^{50, 3}_0 ∨ false 
c  in DIMACS:
-16862 -16863 -16864  0

c i = 4
c  -2+1 --> -1
c    ( b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧  p_200) -> ( b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0)
c  in CNF:
c    -b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨  b^{50, 5}_2
c    -b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_1
c    -b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨  b^{50, 5}_0
c  in DIMACS:
-16865 -16866  16867 -200  16868 0
-16865 -16866  16867 -200 -16869 0
-16865 -16866  16867 -200  16870 0

c  -1+1 --> 0
c    ( b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0 ∧  p_200) -> (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧ -b^{50, 5}_0)
c  in CNF:
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_2
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_1
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_0
c  in DIMACS:
-16865  16866 -16867 -200 -16868 0
-16865  16866 -16867 -200 -16869 0
-16865  16866 -16867 -200 -16870 0

c  0+1 --> 1
c    (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧  p_200) -> (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0)
c  in CNF:
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_2
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_1
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨  b^{50, 5}_0
c  in DIMACS:
 16865  16866  16867 -200 -16868 0
 16865  16866  16867 -200 -16869 0
 16865  16866  16867 -200  16870 0

c  1+1 --> 2
c    (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0 ∧  p_200) -> (-b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0)
c  in CNF:
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_2
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨  b^{50, 5}_1
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ -p_200 ∨ -b^{50, 5}_0
c  in DIMACS:
 16865  16866 -16867 -200 -16868 0
 16865  16866 -16867 -200  16869 0
 16865  16866 -16867 -200 -16870 0

c  2+1 --> break 
c    (-b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧  p_200) -> break
c  in CNF:
c     b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 16865 -16866  16867 -200 1162 0


c  2-1 --> 1
c    (-b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧ -p_200) -> (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0)
c  in CNF:
c     b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_2
c     b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_1
c     b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨  b^{50, 5}_0
c  in DIMACS:
 16865 -16866  16867  200 -16868 0
 16865 -16866  16867  200 -16869 0
 16865 -16866  16867  200  16870 0

c  1-1 --> 0
c    (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0 ∧ -p_200) -> (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧ -b^{50, 5}_0)
c  in CNF:
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_2
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_1
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_0
c  in DIMACS:
 16865  16866 -16867  200 -16868 0
 16865  16866 -16867  200 -16869 0
 16865  16866 -16867  200 -16870 0

c  0-1 --> -1
c    (-b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧ -p_200) -> ( b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0)
c  in CNF:
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨  b^{50, 5}_2
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_1
c     b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨  b^{50, 5}_0
c  in DIMACS:
 16865  16866  16867  200  16868 0
 16865  16866  16867  200 -16869 0
 16865  16866  16867  200  16870 0

c  -1-1 --> -2
c    ( b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧  b^{50, 4}_0 ∧ -p_200) -> ( b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0)
c  in CNF:
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨  b^{50, 5}_2
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨  b^{50, 5}_1
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨  p_200 ∨ -b^{50, 5}_0
c  in DIMACS:
-16865  16866 -16867  200  16868 0
-16865  16866 -16867  200  16869 0
-16865  16866 -16867  200 -16870 0

c  -2-1 --> break 
c    ( b^{50, 4}_2 ∧  b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨  b^{50, 4}_0 ∨  p_200 ∨ break
c  in DIMACS:
-16865 -16866  16867  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 4}_2 ∧ -b^{50, 4}_1 ∧ -b^{50, 4}_0 ∧ true) 
c  in CNF:
c    -b^{50, 4}_2 ∨  b^{50, 4}_1 ∨  b^{50, 4}_0 ∨ false 
c  in DIMACS:
-16865  16866  16867  0

c  3 does not represent an automaton state.
c    -(-b^{50, 4}_2 ∧  b^{50, 4}_1 ∧  b^{50, 4}_0 ∧ true) 
c  in CNF:
c     b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ false 
c  in DIMACS:
 16865 -16866 -16867  0
c  -3 does not represent an automaton state.
c    -( b^{50, 4}_2 ∧  b^{50, 4}_1 ∧  b^{50, 4}_0 ∧ true) 
c  in CNF:
c    -b^{50, 4}_2 ∨ -b^{50, 4}_1 ∨ -b^{50, 4}_0 ∨ false 
c  in DIMACS:
-16865 -16866 -16867  0

c i = 5
c  -2+1 --> -1
c    ( b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧  p_250) -> ( b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0)
c  in CNF:
c    -b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨  b^{50, 6}_2
c    -b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_1
c    -b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨  b^{50, 6}_0
c  in DIMACS:
-16868 -16869  16870 -250  16871 0
-16868 -16869  16870 -250 -16872 0
-16868 -16869  16870 -250  16873 0

c  -1+1 --> 0
c    ( b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0 ∧  p_250) -> (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧ -b^{50, 6}_0)
c  in CNF:
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_2
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_1
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_0
c  in DIMACS:
-16868  16869 -16870 -250 -16871 0
-16868  16869 -16870 -250 -16872 0
-16868  16869 -16870 -250 -16873 0

c  0+1 --> 1
c    (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧  p_250) -> (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0)
c  in CNF:
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_2
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_1
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨  b^{50, 6}_0
c  in DIMACS:
 16868  16869  16870 -250 -16871 0
 16868  16869  16870 -250 -16872 0
 16868  16869  16870 -250  16873 0

c  1+1 --> 2
c    (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0 ∧  p_250) -> (-b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0)
c  in CNF:
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_2
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨  b^{50, 6}_1
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ -p_250 ∨ -b^{50, 6}_0
c  in DIMACS:
 16868  16869 -16870 -250 -16871 0
 16868  16869 -16870 -250  16872 0
 16868  16869 -16870 -250 -16873 0

c  2+1 --> break 
c    (-b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧  p_250) -> break
c  in CNF:
c     b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 16868 -16869  16870 -250 1162 0


c  2-1 --> 1
c    (-b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧ -p_250) -> (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0)
c  in CNF:
c     b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_2
c     b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_1
c     b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨  b^{50, 6}_0
c  in DIMACS:
 16868 -16869  16870  250 -16871 0
 16868 -16869  16870  250 -16872 0
 16868 -16869  16870  250  16873 0

c  1-1 --> 0
c    (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0 ∧ -p_250) -> (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧ -b^{50, 6}_0)
c  in CNF:
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_2
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_1
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_0
c  in DIMACS:
 16868  16869 -16870  250 -16871 0
 16868  16869 -16870  250 -16872 0
 16868  16869 -16870  250 -16873 0

c  0-1 --> -1
c    (-b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧ -p_250) -> ( b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0)
c  in CNF:
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨  b^{50, 6}_2
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_1
c     b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨  b^{50, 6}_0
c  in DIMACS:
 16868  16869  16870  250  16871 0
 16868  16869  16870  250 -16872 0
 16868  16869  16870  250  16873 0

c  -1-1 --> -2
c    ( b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧  b^{50, 5}_0 ∧ -p_250) -> ( b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0)
c  in CNF:
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨  b^{50, 6}_2
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨  b^{50, 6}_1
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨  p_250 ∨ -b^{50, 6}_0
c  in DIMACS:
-16868  16869 -16870  250  16871 0
-16868  16869 -16870  250  16872 0
-16868  16869 -16870  250 -16873 0

c  -2-1 --> break 
c    ( b^{50, 5}_2 ∧  b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨  b^{50, 5}_0 ∨  p_250 ∨ break
c  in DIMACS:
-16868 -16869  16870  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 5}_2 ∧ -b^{50, 5}_1 ∧ -b^{50, 5}_0 ∧ true) 
c  in CNF:
c    -b^{50, 5}_2 ∨  b^{50, 5}_1 ∨  b^{50, 5}_0 ∨ false 
c  in DIMACS:
-16868  16869  16870  0

c  3 does not represent an automaton state.
c    -(-b^{50, 5}_2 ∧  b^{50, 5}_1 ∧  b^{50, 5}_0 ∧ true) 
c  in CNF:
c     b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ false 
c  in DIMACS:
 16868 -16869 -16870  0
c  -3 does not represent an automaton state.
c    -( b^{50, 5}_2 ∧  b^{50, 5}_1 ∧  b^{50, 5}_0 ∧ true) 
c  in CNF:
c    -b^{50, 5}_2 ∨ -b^{50, 5}_1 ∨ -b^{50, 5}_0 ∨ false 
c  in DIMACS:
-16868 -16869 -16870  0

c i = 6
c  -2+1 --> -1
c    ( b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧  p_300) -> ( b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0)
c  in CNF:
c    -b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨  b^{50, 7}_2
c    -b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_1
c    -b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨  b^{50, 7}_0
c  in DIMACS:
-16871 -16872  16873 -300  16874 0
-16871 -16872  16873 -300 -16875 0
-16871 -16872  16873 -300  16876 0

c  -1+1 --> 0
c    ( b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0 ∧  p_300) -> (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧ -b^{50, 7}_0)
c  in CNF:
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_2
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_1
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_0
c  in DIMACS:
-16871  16872 -16873 -300 -16874 0
-16871  16872 -16873 -300 -16875 0
-16871  16872 -16873 -300 -16876 0

c  0+1 --> 1
c    (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧  p_300) -> (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0)
c  in CNF:
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_2
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_1
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨  b^{50, 7}_0
c  in DIMACS:
 16871  16872  16873 -300 -16874 0
 16871  16872  16873 -300 -16875 0
 16871  16872  16873 -300  16876 0

c  1+1 --> 2
c    (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0 ∧  p_300) -> (-b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0)
c  in CNF:
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_2
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨  b^{50, 7}_1
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ -p_300 ∨ -b^{50, 7}_0
c  in DIMACS:
 16871  16872 -16873 -300 -16874 0
 16871  16872 -16873 -300  16875 0
 16871  16872 -16873 -300 -16876 0

c  2+1 --> break 
c    (-b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧  p_300) -> break
c  in CNF:
c     b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 16871 -16872  16873 -300 1162 0


c  2-1 --> 1
c    (-b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧ -p_300) -> (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0)
c  in CNF:
c     b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_2
c     b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_1
c     b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨  b^{50, 7}_0
c  in DIMACS:
 16871 -16872  16873  300 -16874 0
 16871 -16872  16873  300 -16875 0
 16871 -16872  16873  300  16876 0

c  1-1 --> 0
c    (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0 ∧ -p_300) -> (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧ -b^{50, 7}_0)
c  in CNF:
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_2
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_1
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_0
c  in DIMACS:
 16871  16872 -16873  300 -16874 0
 16871  16872 -16873  300 -16875 0
 16871  16872 -16873  300 -16876 0

c  0-1 --> -1
c    (-b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧ -p_300) -> ( b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0)
c  in CNF:
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨  b^{50, 7}_2
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_1
c     b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨  b^{50, 7}_0
c  in DIMACS:
 16871  16872  16873  300  16874 0
 16871  16872  16873  300 -16875 0
 16871  16872  16873  300  16876 0

c  -1-1 --> -2
c    ( b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧  b^{50, 6}_0 ∧ -p_300) -> ( b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0)
c  in CNF:
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨  b^{50, 7}_2
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨  b^{50, 7}_1
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨  p_300 ∨ -b^{50, 7}_0
c  in DIMACS:
-16871  16872 -16873  300  16874 0
-16871  16872 -16873  300  16875 0
-16871  16872 -16873  300 -16876 0

c  -2-1 --> break 
c    ( b^{50, 6}_2 ∧  b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨  b^{50, 6}_0 ∨  p_300 ∨ break
c  in DIMACS:
-16871 -16872  16873  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 6}_2 ∧ -b^{50, 6}_1 ∧ -b^{50, 6}_0 ∧ true) 
c  in CNF:
c    -b^{50, 6}_2 ∨  b^{50, 6}_1 ∨  b^{50, 6}_0 ∨ false 
c  in DIMACS:
-16871  16872  16873  0

c  3 does not represent an automaton state.
c    -(-b^{50, 6}_2 ∧  b^{50, 6}_1 ∧  b^{50, 6}_0 ∧ true) 
c  in CNF:
c     b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ false 
c  in DIMACS:
 16871 -16872 -16873  0
c  -3 does not represent an automaton state.
c    -( b^{50, 6}_2 ∧  b^{50, 6}_1 ∧  b^{50, 6}_0 ∧ true) 
c  in CNF:
c    -b^{50, 6}_2 ∨ -b^{50, 6}_1 ∨ -b^{50, 6}_0 ∨ false 
c  in DIMACS:
-16871 -16872 -16873  0

c i = 7
c  -2+1 --> -1
c    ( b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧  p_350) -> ( b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0)
c  in CNF:
c    -b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨  b^{50, 8}_2
c    -b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_1
c    -b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨  b^{50, 8}_0
c  in DIMACS:
-16874 -16875  16876 -350  16877 0
-16874 -16875  16876 -350 -16878 0
-16874 -16875  16876 -350  16879 0

c  -1+1 --> 0
c    ( b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0 ∧  p_350) -> (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧ -b^{50, 8}_0)
c  in CNF:
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_2
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_1
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_0
c  in DIMACS:
-16874  16875 -16876 -350 -16877 0
-16874  16875 -16876 -350 -16878 0
-16874  16875 -16876 -350 -16879 0

c  0+1 --> 1
c    (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧  p_350) -> (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0)
c  in CNF:
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_2
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_1
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨  b^{50, 8}_0
c  in DIMACS:
 16874  16875  16876 -350 -16877 0
 16874  16875  16876 -350 -16878 0
 16874  16875  16876 -350  16879 0

c  1+1 --> 2
c    (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0 ∧  p_350) -> (-b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0)
c  in CNF:
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_2
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨  b^{50, 8}_1
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ -p_350 ∨ -b^{50, 8}_0
c  in DIMACS:
 16874  16875 -16876 -350 -16877 0
 16874  16875 -16876 -350  16878 0
 16874  16875 -16876 -350 -16879 0

c  2+1 --> break 
c    (-b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧  p_350) -> break
c  in CNF:
c     b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 16874 -16875  16876 -350 1162 0


c  2-1 --> 1
c    (-b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧ -p_350) -> (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0)
c  in CNF:
c     b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_2
c     b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_1
c     b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨  b^{50, 8}_0
c  in DIMACS:
 16874 -16875  16876  350 -16877 0
 16874 -16875  16876  350 -16878 0
 16874 -16875  16876  350  16879 0

c  1-1 --> 0
c    (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0 ∧ -p_350) -> (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧ -b^{50, 8}_0)
c  in CNF:
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_2
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_1
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_0
c  in DIMACS:
 16874  16875 -16876  350 -16877 0
 16874  16875 -16876  350 -16878 0
 16874  16875 -16876  350 -16879 0

c  0-1 --> -1
c    (-b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧ -p_350) -> ( b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0)
c  in CNF:
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨  b^{50, 8}_2
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_1
c     b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨  b^{50, 8}_0
c  in DIMACS:
 16874  16875  16876  350  16877 0
 16874  16875  16876  350 -16878 0
 16874  16875  16876  350  16879 0

c  -1-1 --> -2
c    ( b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧  b^{50, 7}_0 ∧ -p_350) -> ( b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0)
c  in CNF:
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨  b^{50, 8}_2
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨  b^{50, 8}_1
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨  p_350 ∨ -b^{50, 8}_0
c  in DIMACS:
-16874  16875 -16876  350  16877 0
-16874  16875 -16876  350  16878 0
-16874  16875 -16876  350 -16879 0

c  -2-1 --> break 
c    ( b^{50, 7}_2 ∧  b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨  b^{50, 7}_0 ∨  p_350 ∨ break
c  in DIMACS:
-16874 -16875  16876  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 7}_2 ∧ -b^{50, 7}_1 ∧ -b^{50, 7}_0 ∧ true) 
c  in CNF:
c    -b^{50, 7}_2 ∨  b^{50, 7}_1 ∨  b^{50, 7}_0 ∨ false 
c  in DIMACS:
-16874  16875  16876  0

c  3 does not represent an automaton state.
c    -(-b^{50, 7}_2 ∧  b^{50, 7}_1 ∧  b^{50, 7}_0 ∧ true) 
c  in CNF:
c     b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ false 
c  in DIMACS:
 16874 -16875 -16876  0
c  -3 does not represent an automaton state.
c    -( b^{50, 7}_2 ∧  b^{50, 7}_1 ∧  b^{50, 7}_0 ∧ true) 
c  in CNF:
c    -b^{50, 7}_2 ∨ -b^{50, 7}_1 ∨ -b^{50, 7}_0 ∨ false 
c  in DIMACS:
-16874 -16875 -16876  0

c i = 8
c  -2+1 --> -1
c    ( b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧  p_400) -> ( b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0)
c  in CNF:
c    -b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨  b^{50, 9}_2
c    -b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_1
c    -b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨  b^{50, 9}_0
c  in DIMACS:
-16877 -16878  16879 -400  16880 0
-16877 -16878  16879 -400 -16881 0
-16877 -16878  16879 -400  16882 0

c  -1+1 --> 0
c    ( b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0 ∧  p_400) -> (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧ -b^{50, 9}_0)
c  in CNF:
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_2
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_1
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_0
c  in DIMACS:
-16877  16878 -16879 -400 -16880 0
-16877  16878 -16879 -400 -16881 0
-16877  16878 -16879 -400 -16882 0

c  0+1 --> 1
c    (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧  p_400) -> (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0)
c  in CNF:
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_2
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_1
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨  b^{50, 9}_0
c  in DIMACS:
 16877  16878  16879 -400 -16880 0
 16877  16878  16879 -400 -16881 0
 16877  16878  16879 -400  16882 0

c  1+1 --> 2
c    (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0 ∧  p_400) -> (-b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0)
c  in CNF:
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_2
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨  b^{50, 9}_1
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ -p_400 ∨ -b^{50, 9}_0
c  in DIMACS:
 16877  16878 -16879 -400 -16880 0
 16877  16878 -16879 -400  16881 0
 16877  16878 -16879 -400 -16882 0

c  2+1 --> break 
c    (-b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧  p_400) -> break
c  in CNF:
c     b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 16877 -16878  16879 -400 1162 0


c  2-1 --> 1
c    (-b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧ -p_400) -> (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0)
c  in CNF:
c     b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_2
c     b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_1
c     b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨  b^{50, 9}_0
c  in DIMACS:
 16877 -16878  16879  400 -16880 0
 16877 -16878  16879  400 -16881 0
 16877 -16878  16879  400  16882 0

c  1-1 --> 0
c    (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0 ∧ -p_400) -> (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧ -b^{50, 9}_0)
c  in CNF:
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_2
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_1
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_0
c  in DIMACS:
 16877  16878 -16879  400 -16880 0
 16877  16878 -16879  400 -16881 0
 16877  16878 -16879  400 -16882 0

c  0-1 --> -1
c    (-b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧ -p_400) -> ( b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0)
c  in CNF:
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨  b^{50, 9}_2
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_1
c     b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨  b^{50, 9}_0
c  in DIMACS:
 16877  16878  16879  400  16880 0
 16877  16878  16879  400 -16881 0
 16877  16878  16879  400  16882 0

c  -1-1 --> -2
c    ( b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧  b^{50, 8}_0 ∧ -p_400) -> ( b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0)
c  in CNF:
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨  b^{50, 9}_2
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨  b^{50, 9}_1
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨  p_400 ∨ -b^{50, 9}_0
c  in DIMACS:
-16877  16878 -16879  400  16880 0
-16877  16878 -16879  400  16881 0
-16877  16878 -16879  400 -16882 0

c  -2-1 --> break 
c    ( b^{50, 8}_2 ∧  b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨  b^{50, 8}_0 ∨  p_400 ∨ break
c  in DIMACS:
-16877 -16878  16879  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 8}_2 ∧ -b^{50, 8}_1 ∧ -b^{50, 8}_0 ∧ true) 
c  in CNF:
c    -b^{50, 8}_2 ∨  b^{50, 8}_1 ∨  b^{50, 8}_0 ∨ false 
c  in DIMACS:
-16877  16878  16879  0

c  3 does not represent an automaton state.
c    -(-b^{50, 8}_2 ∧  b^{50, 8}_1 ∧  b^{50, 8}_0 ∧ true) 
c  in CNF:
c     b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ false 
c  in DIMACS:
 16877 -16878 -16879  0
c  -3 does not represent an automaton state.
c    -( b^{50, 8}_2 ∧  b^{50, 8}_1 ∧  b^{50, 8}_0 ∧ true) 
c  in CNF:
c    -b^{50, 8}_2 ∨ -b^{50, 8}_1 ∨ -b^{50, 8}_0 ∨ false 
c  in DIMACS:
-16877 -16878 -16879  0

c i = 9
c  -2+1 --> -1
c    ( b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧  p_450) -> ( b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0)
c  in CNF:
c    -b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨  b^{50, 10}_2
c    -b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_1
c    -b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨  b^{50, 10}_0
c  in DIMACS:
-16880 -16881  16882 -450  16883 0
-16880 -16881  16882 -450 -16884 0
-16880 -16881  16882 -450  16885 0

c  -1+1 --> 0
c    ( b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0 ∧  p_450) -> (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧ -b^{50, 10}_0)
c  in CNF:
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_2
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_1
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_0
c  in DIMACS:
-16880  16881 -16882 -450 -16883 0
-16880  16881 -16882 -450 -16884 0
-16880  16881 -16882 -450 -16885 0

c  0+1 --> 1
c    (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧  p_450) -> (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0)
c  in CNF:
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_2
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_1
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨  b^{50, 10}_0
c  in DIMACS:
 16880  16881  16882 -450 -16883 0
 16880  16881  16882 -450 -16884 0
 16880  16881  16882 -450  16885 0

c  1+1 --> 2
c    (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0 ∧  p_450) -> (-b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0)
c  in CNF:
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_2
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨  b^{50, 10}_1
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ -p_450 ∨ -b^{50, 10}_0
c  in DIMACS:
 16880  16881 -16882 -450 -16883 0
 16880  16881 -16882 -450  16884 0
 16880  16881 -16882 -450 -16885 0

c  2+1 --> break 
c    (-b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧  p_450) -> break
c  in CNF:
c     b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 16880 -16881  16882 -450 1162 0


c  2-1 --> 1
c    (-b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧ -p_450) -> (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0)
c  in CNF:
c     b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_2
c     b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_1
c     b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨  b^{50, 10}_0
c  in DIMACS:
 16880 -16881  16882  450 -16883 0
 16880 -16881  16882  450 -16884 0
 16880 -16881  16882  450  16885 0

c  1-1 --> 0
c    (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0 ∧ -p_450) -> (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧ -b^{50, 10}_0)
c  in CNF:
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_2
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_1
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_0
c  in DIMACS:
 16880  16881 -16882  450 -16883 0
 16880  16881 -16882  450 -16884 0
 16880  16881 -16882  450 -16885 0

c  0-1 --> -1
c    (-b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧ -p_450) -> ( b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0)
c  in CNF:
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨  b^{50, 10}_2
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_1
c     b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨  b^{50, 10}_0
c  in DIMACS:
 16880  16881  16882  450  16883 0
 16880  16881  16882  450 -16884 0
 16880  16881  16882  450  16885 0

c  -1-1 --> -2
c    ( b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧  b^{50, 9}_0 ∧ -p_450) -> ( b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0)
c  in CNF:
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨  b^{50, 10}_2
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨  b^{50, 10}_1
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨  p_450 ∨ -b^{50, 10}_0
c  in DIMACS:
-16880  16881 -16882  450  16883 0
-16880  16881 -16882  450  16884 0
-16880  16881 -16882  450 -16885 0

c  -2-1 --> break 
c    ( b^{50, 9}_2 ∧  b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨  b^{50, 9}_0 ∨  p_450 ∨ break
c  in DIMACS:
-16880 -16881  16882  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 9}_2 ∧ -b^{50, 9}_1 ∧ -b^{50, 9}_0 ∧ true) 
c  in CNF:
c    -b^{50, 9}_2 ∨  b^{50, 9}_1 ∨  b^{50, 9}_0 ∨ false 
c  in DIMACS:
-16880  16881  16882  0

c  3 does not represent an automaton state.
c    -(-b^{50, 9}_2 ∧  b^{50, 9}_1 ∧  b^{50, 9}_0 ∧ true) 
c  in CNF:
c     b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ false 
c  in DIMACS:
 16880 -16881 -16882  0
c  -3 does not represent an automaton state.
c    -( b^{50, 9}_2 ∧  b^{50, 9}_1 ∧  b^{50, 9}_0 ∧ true) 
c  in CNF:
c    -b^{50, 9}_2 ∨ -b^{50, 9}_1 ∨ -b^{50, 9}_0 ∨ false 
c  in DIMACS:
-16880 -16881 -16882  0

c i = 10
c  -2+1 --> -1
c    ( b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧  p_500) -> ( b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0)
c  in CNF:
c    -b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨  b^{50, 11}_2
c    -b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_1
c    -b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨  b^{50, 11}_0
c  in DIMACS:
-16883 -16884  16885 -500  16886 0
-16883 -16884  16885 -500 -16887 0
-16883 -16884  16885 -500  16888 0

c  -1+1 --> 0
c    ( b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0 ∧  p_500) -> (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧ -b^{50, 11}_0)
c  in CNF:
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_2
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_1
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_0
c  in DIMACS:
-16883  16884 -16885 -500 -16886 0
-16883  16884 -16885 -500 -16887 0
-16883  16884 -16885 -500 -16888 0

c  0+1 --> 1
c    (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧  p_500) -> (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0)
c  in CNF:
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_2
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_1
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨  b^{50, 11}_0
c  in DIMACS:
 16883  16884  16885 -500 -16886 0
 16883  16884  16885 -500 -16887 0
 16883  16884  16885 -500  16888 0

c  1+1 --> 2
c    (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0 ∧  p_500) -> (-b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0)
c  in CNF:
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_2
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨  b^{50, 11}_1
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ -p_500 ∨ -b^{50, 11}_0
c  in DIMACS:
 16883  16884 -16885 -500 -16886 0
 16883  16884 -16885 -500  16887 0
 16883  16884 -16885 -500 -16888 0

c  2+1 --> break 
c    (-b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧  p_500) -> break
c  in CNF:
c     b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 16883 -16884  16885 -500 1162 0


c  2-1 --> 1
c    (-b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧ -p_500) -> (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0)
c  in CNF:
c     b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_2
c     b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_1
c     b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨  b^{50, 11}_0
c  in DIMACS:
 16883 -16884  16885  500 -16886 0
 16883 -16884  16885  500 -16887 0
 16883 -16884  16885  500  16888 0

c  1-1 --> 0
c    (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0 ∧ -p_500) -> (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧ -b^{50, 11}_0)
c  in CNF:
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_2
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_1
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_0
c  in DIMACS:
 16883  16884 -16885  500 -16886 0
 16883  16884 -16885  500 -16887 0
 16883  16884 -16885  500 -16888 0

c  0-1 --> -1
c    (-b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧ -p_500) -> ( b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0)
c  in CNF:
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨  b^{50, 11}_2
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_1
c     b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨  b^{50, 11}_0
c  in DIMACS:
 16883  16884  16885  500  16886 0
 16883  16884  16885  500 -16887 0
 16883  16884  16885  500  16888 0

c  -1-1 --> -2
c    ( b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧  b^{50, 10}_0 ∧ -p_500) -> ( b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0)
c  in CNF:
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨  b^{50, 11}_2
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨  b^{50, 11}_1
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨  p_500 ∨ -b^{50, 11}_0
c  in DIMACS:
-16883  16884 -16885  500  16886 0
-16883  16884 -16885  500  16887 0
-16883  16884 -16885  500 -16888 0

c  -2-1 --> break 
c    ( b^{50, 10}_2 ∧  b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨  b^{50, 10}_0 ∨  p_500 ∨ break
c  in DIMACS:
-16883 -16884  16885  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 10}_2 ∧ -b^{50, 10}_1 ∧ -b^{50, 10}_0 ∧ true) 
c  in CNF:
c    -b^{50, 10}_2 ∨  b^{50, 10}_1 ∨  b^{50, 10}_0 ∨ false 
c  in DIMACS:
-16883  16884  16885  0

c  3 does not represent an automaton state.
c    -(-b^{50, 10}_2 ∧  b^{50, 10}_1 ∧  b^{50, 10}_0 ∧ true) 
c  in CNF:
c     b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ false 
c  in DIMACS:
 16883 -16884 -16885  0
c  -3 does not represent an automaton state.
c    -( b^{50, 10}_2 ∧  b^{50, 10}_1 ∧  b^{50, 10}_0 ∧ true) 
c  in CNF:
c    -b^{50, 10}_2 ∨ -b^{50, 10}_1 ∨ -b^{50, 10}_0 ∨ false 
c  in DIMACS:
-16883 -16884 -16885  0

c i = 11
c  -2+1 --> -1
c    ( b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧  p_550) -> ( b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0)
c  in CNF:
c    -b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨  b^{50, 12}_2
c    -b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_1
c    -b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨  b^{50, 12}_0
c  in DIMACS:
-16886 -16887  16888 -550  16889 0
-16886 -16887  16888 -550 -16890 0
-16886 -16887  16888 -550  16891 0

c  -1+1 --> 0
c    ( b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0 ∧  p_550) -> (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧ -b^{50, 12}_0)
c  in CNF:
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_2
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_1
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_0
c  in DIMACS:
-16886  16887 -16888 -550 -16889 0
-16886  16887 -16888 -550 -16890 0
-16886  16887 -16888 -550 -16891 0

c  0+1 --> 1
c    (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧  p_550) -> (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0)
c  in CNF:
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_2
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_1
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨  b^{50, 12}_0
c  in DIMACS:
 16886  16887  16888 -550 -16889 0
 16886  16887  16888 -550 -16890 0
 16886  16887  16888 -550  16891 0

c  1+1 --> 2
c    (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0 ∧  p_550) -> (-b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0)
c  in CNF:
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_2
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨  b^{50, 12}_1
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ -p_550 ∨ -b^{50, 12}_0
c  in DIMACS:
 16886  16887 -16888 -550 -16889 0
 16886  16887 -16888 -550  16890 0
 16886  16887 -16888 -550 -16891 0

c  2+1 --> break 
c    (-b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧  p_550) -> break
c  in CNF:
c     b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 16886 -16887  16888 -550 1162 0


c  2-1 --> 1
c    (-b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧ -p_550) -> (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0)
c  in CNF:
c     b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_2
c     b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_1
c     b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨  b^{50, 12}_0
c  in DIMACS:
 16886 -16887  16888  550 -16889 0
 16886 -16887  16888  550 -16890 0
 16886 -16887  16888  550  16891 0

c  1-1 --> 0
c    (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0 ∧ -p_550) -> (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧ -b^{50, 12}_0)
c  in CNF:
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_2
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_1
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_0
c  in DIMACS:
 16886  16887 -16888  550 -16889 0
 16886  16887 -16888  550 -16890 0
 16886  16887 -16888  550 -16891 0

c  0-1 --> -1
c    (-b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧ -p_550) -> ( b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0)
c  in CNF:
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨  b^{50, 12}_2
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_1
c     b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨  b^{50, 12}_0
c  in DIMACS:
 16886  16887  16888  550  16889 0
 16886  16887  16888  550 -16890 0
 16886  16887  16888  550  16891 0

c  -1-1 --> -2
c    ( b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧  b^{50, 11}_0 ∧ -p_550) -> ( b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0)
c  in CNF:
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨  b^{50, 12}_2
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨  b^{50, 12}_1
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨  p_550 ∨ -b^{50, 12}_0
c  in DIMACS:
-16886  16887 -16888  550  16889 0
-16886  16887 -16888  550  16890 0
-16886  16887 -16888  550 -16891 0

c  -2-1 --> break 
c    ( b^{50, 11}_2 ∧  b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨  b^{50, 11}_0 ∨  p_550 ∨ break
c  in DIMACS:
-16886 -16887  16888  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 11}_2 ∧ -b^{50, 11}_1 ∧ -b^{50, 11}_0 ∧ true) 
c  in CNF:
c    -b^{50, 11}_2 ∨  b^{50, 11}_1 ∨  b^{50, 11}_0 ∨ false 
c  in DIMACS:
-16886  16887  16888  0

c  3 does not represent an automaton state.
c    -(-b^{50, 11}_2 ∧  b^{50, 11}_1 ∧  b^{50, 11}_0 ∧ true) 
c  in CNF:
c     b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ false 
c  in DIMACS:
 16886 -16887 -16888  0
c  -3 does not represent an automaton state.
c    -( b^{50, 11}_2 ∧  b^{50, 11}_1 ∧  b^{50, 11}_0 ∧ true) 
c  in CNF:
c    -b^{50, 11}_2 ∨ -b^{50, 11}_1 ∨ -b^{50, 11}_0 ∨ false 
c  in DIMACS:
-16886 -16887 -16888  0

c i = 12
c  -2+1 --> -1
c    ( b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧  p_600) -> ( b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0)
c  in CNF:
c    -b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨  b^{50, 13}_2
c    -b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_1
c    -b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨  b^{50, 13}_0
c  in DIMACS:
-16889 -16890  16891 -600  16892 0
-16889 -16890  16891 -600 -16893 0
-16889 -16890  16891 -600  16894 0

c  -1+1 --> 0
c    ( b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0 ∧  p_600) -> (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧ -b^{50, 13}_0)
c  in CNF:
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_2
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_1
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_0
c  in DIMACS:
-16889  16890 -16891 -600 -16892 0
-16889  16890 -16891 -600 -16893 0
-16889  16890 -16891 -600 -16894 0

c  0+1 --> 1
c    (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧  p_600) -> (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0)
c  in CNF:
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_2
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_1
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨  b^{50, 13}_0
c  in DIMACS:
 16889  16890  16891 -600 -16892 0
 16889  16890  16891 -600 -16893 0
 16889  16890  16891 -600  16894 0

c  1+1 --> 2
c    (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0 ∧  p_600) -> (-b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0)
c  in CNF:
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_2
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨  b^{50, 13}_1
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ -p_600 ∨ -b^{50, 13}_0
c  in DIMACS:
 16889  16890 -16891 -600 -16892 0
 16889  16890 -16891 -600  16893 0
 16889  16890 -16891 -600 -16894 0

c  2+1 --> break 
c    (-b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧  p_600) -> break
c  in CNF:
c     b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 16889 -16890  16891 -600 1162 0


c  2-1 --> 1
c    (-b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧ -p_600) -> (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0)
c  in CNF:
c     b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_2
c     b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_1
c     b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨  b^{50, 13}_0
c  in DIMACS:
 16889 -16890  16891  600 -16892 0
 16889 -16890  16891  600 -16893 0
 16889 -16890  16891  600  16894 0

c  1-1 --> 0
c    (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0 ∧ -p_600) -> (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧ -b^{50, 13}_0)
c  in CNF:
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_2
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_1
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_0
c  in DIMACS:
 16889  16890 -16891  600 -16892 0
 16889  16890 -16891  600 -16893 0
 16889  16890 -16891  600 -16894 0

c  0-1 --> -1
c    (-b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧ -p_600) -> ( b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0)
c  in CNF:
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨  b^{50, 13}_2
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_1
c     b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨  b^{50, 13}_0
c  in DIMACS:
 16889  16890  16891  600  16892 0
 16889  16890  16891  600 -16893 0
 16889  16890  16891  600  16894 0

c  -1-1 --> -2
c    ( b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧  b^{50, 12}_0 ∧ -p_600) -> ( b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0)
c  in CNF:
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨  b^{50, 13}_2
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨  b^{50, 13}_1
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨  p_600 ∨ -b^{50, 13}_0
c  in DIMACS:
-16889  16890 -16891  600  16892 0
-16889  16890 -16891  600  16893 0
-16889  16890 -16891  600 -16894 0

c  -2-1 --> break 
c    ( b^{50, 12}_2 ∧  b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨  b^{50, 12}_0 ∨  p_600 ∨ break
c  in DIMACS:
-16889 -16890  16891  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 12}_2 ∧ -b^{50, 12}_1 ∧ -b^{50, 12}_0 ∧ true) 
c  in CNF:
c    -b^{50, 12}_2 ∨  b^{50, 12}_1 ∨  b^{50, 12}_0 ∨ false 
c  in DIMACS:
-16889  16890  16891  0

c  3 does not represent an automaton state.
c    -(-b^{50, 12}_2 ∧  b^{50, 12}_1 ∧  b^{50, 12}_0 ∧ true) 
c  in CNF:
c     b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ false 
c  in DIMACS:
 16889 -16890 -16891  0
c  -3 does not represent an automaton state.
c    -( b^{50, 12}_2 ∧  b^{50, 12}_1 ∧  b^{50, 12}_0 ∧ true) 
c  in CNF:
c    -b^{50, 12}_2 ∨ -b^{50, 12}_1 ∨ -b^{50, 12}_0 ∨ false 
c  in DIMACS:
-16889 -16890 -16891  0

c i = 13
c  -2+1 --> -1
c    ( b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧  p_650) -> ( b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0)
c  in CNF:
c    -b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨  b^{50, 14}_2
c    -b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_1
c    -b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨  b^{50, 14}_0
c  in DIMACS:
-16892 -16893  16894 -650  16895 0
-16892 -16893  16894 -650 -16896 0
-16892 -16893  16894 -650  16897 0

c  -1+1 --> 0
c    ( b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0 ∧  p_650) -> (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧ -b^{50, 14}_0)
c  in CNF:
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_2
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_1
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_0
c  in DIMACS:
-16892  16893 -16894 -650 -16895 0
-16892  16893 -16894 -650 -16896 0
-16892  16893 -16894 -650 -16897 0

c  0+1 --> 1
c    (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧  p_650) -> (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0)
c  in CNF:
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_2
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_1
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨  b^{50, 14}_0
c  in DIMACS:
 16892  16893  16894 -650 -16895 0
 16892  16893  16894 -650 -16896 0
 16892  16893  16894 -650  16897 0

c  1+1 --> 2
c    (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0 ∧  p_650) -> (-b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0)
c  in CNF:
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_2
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨  b^{50, 14}_1
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ -p_650 ∨ -b^{50, 14}_0
c  in DIMACS:
 16892  16893 -16894 -650 -16895 0
 16892  16893 -16894 -650  16896 0
 16892  16893 -16894 -650 -16897 0

c  2+1 --> break 
c    (-b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧  p_650) -> break
c  in CNF:
c     b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 16892 -16893  16894 -650 1162 0


c  2-1 --> 1
c    (-b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧ -p_650) -> (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0)
c  in CNF:
c     b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_2
c     b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_1
c     b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨  b^{50, 14}_0
c  in DIMACS:
 16892 -16893  16894  650 -16895 0
 16892 -16893  16894  650 -16896 0
 16892 -16893  16894  650  16897 0

c  1-1 --> 0
c    (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0 ∧ -p_650) -> (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧ -b^{50, 14}_0)
c  in CNF:
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_2
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_1
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_0
c  in DIMACS:
 16892  16893 -16894  650 -16895 0
 16892  16893 -16894  650 -16896 0
 16892  16893 -16894  650 -16897 0

c  0-1 --> -1
c    (-b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧ -p_650) -> ( b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0)
c  in CNF:
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨  b^{50, 14}_2
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_1
c     b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨  b^{50, 14}_0
c  in DIMACS:
 16892  16893  16894  650  16895 0
 16892  16893  16894  650 -16896 0
 16892  16893  16894  650  16897 0

c  -1-1 --> -2
c    ( b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧  b^{50, 13}_0 ∧ -p_650) -> ( b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0)
c  in CNF:
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨  b^{50, 14}_2
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨  b^{50, 14}_1
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨  p_650 ∨ -b^{50, 14}_0
c  in DIMACS:
-16892  16893 -16894  650  16895 0
-16892  16893 -16894  650  16896 0
-16892  16893 -16894  650 -16897 0

c  -2-1 --> break 
c    ( b^{50, 13}_2 ∧  b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨  b^{50, 13}_0 ∨  p_650 ∨ break
c  in DIMACS:
-16892 -16893  16894  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 13}_2 ∧ -b^{50, 13}_1 ∧ -b^{50, 13}_0 ∧ true) 
c  in CNF:
c    -b^{50, 13}_2 ∨  b^{50, 13}_1 ∨  b^{50, 13}_0 ∨ false 
c  in DIMACS:
-16892  16893  16894  0

c  3 does not represent an automaton state.
c    -(-b^{50, 13}_2 ∧  b^{50, 13}_1 ∧  b^{50, 13}_0 ∧ true) 
c  in CNF:
c     b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ false 
c  in DIMACS:
 16892 -16893 -16894  0
c  -3 does not represent an automaton state.
c    -( b^{50, 13}_2 ∧  b^{50, 13}_1 ∧  b^{50, 13}_0 ∧ true) 
c  in CNF:
c    -b^{50, 13}_2 ∨ -b^{50, 13}_1 ∨ -b^{50, 13}_0 ∨ false 
c  in DIMACS:
-16892 -16893 -16894  0

c i = 14
c  -2+1 --> -1
c    ( b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧  p_700) -> ( b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0)
c  in CNF:
c    -b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨  b^{50, 15}_2
c    -b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_1
c    -b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨  b^{50, 15}_0
c  in DIMACS:
-16895 -16896  16897 -700  16898 0
-16895 -16896  16897 -700 -16899 0
-16895 -16896  16897 -700  16900 0

c  -1+1 --> 0
c    ( b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0 ∧  p_700) -> (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧ -b^{50, 15}_0)
c  in CNF:
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_2
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_1
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_0
c  in DIMACS:
-16895  16896 -16897 -700 -16898 0
-16895  16896 -16897 -700 -16899 0
-16895  16896 -16897 -700 -16900 0

c  0+1 --> 1
c    (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧  p_700) -> (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0)
c  in CNF:
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_2
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_1
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨  b^{50, 15}_0
c  in DIMACS:
 16895  16896  16897 -700 -16898 0
 16895  16896  16897 -700 -16899 0
 16895  16896  16897 -700  16900 0

c  1+1 --> 2
c    (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0 ∧  p_700) -> (-b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0)
c  in CNF:
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_2
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨  b^{50, 15}_1
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ -p_700 ∨ -b^{50, 15}_0
c  in DIMACS:
 16895  16896 -16897 -700 -16898 0
 16895  16896 -16897 -700  16899 0
 16895  16896 -16897 -700 -16900 0

c  2+1 --> break 
c    (-b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧  p_700) -> break
c  in CNF:
c     b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 16895 -16896  16897 -700 1162 0


c  2-1 --> 1
c    (-b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧ -p_700) -> (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0)
c  in CNF:
c     b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_2
c     b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_1
c     b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨  b^{50, 15}_0
c  in DIMACS:
 16895 -16896  16897  700 -16898 0
 16895 -16896  16897  700 -16899 0
 16895 -16896  16897  700  16900 0

c  1-1 --> 0
c    (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0 ∧ -p_700) -> (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧ -b^{50, 15}_0)
c  in CNF:
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_2
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_1
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_0
c  in DIMACS:
 16895  16896 -16897  700 -16898 0
 16895  16896 -16897  700 -16899 0
 16895  16896 -16897  700 -16900 0

c  0-1 --> -1
c    (-b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧ -p_700) -> ( b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0)
c  in CNF:
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨  b^{50, 15}_2
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_1
c     b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨  b^{50, 15}_0
c  in DIMACS:
 16895  16896  16897  700  16898 0
 16895  16896  16897  700 -16899 0
 16895  16896  16897  700  16900 0

c  -1-1 --> -2
c    ( b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧  b^{50, 14}_0 ∧ -p_700) -> ( b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0)
c  in CNF:
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨  b^{50, 15}_2
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨  b^{50, 15}_1
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨  p_700 ∨ -b^{50, 15}_0
c  in DIMACS:
-16895  16896 -16897  700  16898 0
-16895  16896 -16897  700  16899 0
-16895  16896 -16897  700 -16900 0

c  -2-1 --> break 
c    ( b^{50, 14}_2 ∧  b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨  b^{50, 14}_0 ∨  p_700 ∨ break
c  in DIMACS:
-16895 -16896  16897  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 14}_2 ∧ -b^{50, 14}_1 ∧ -b^{50, 14}_0 ∧ true) 
c  in CNF:
c    -b^{50, 14}_2 ∨  b^{50, 14}_1 ∨  b^{50, 14}_0 ∨ false 
c  in DIMACS:
-16895  16896  16897  0

c  3 does not represent an automaton state.
c    -(-b^{50, 14}_2 ∧  b^{50, 14}_1 ∧  b^{50, 14}_0 ∧ true) 
c  in CNF:
c     b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ false 
c  in DIMACS:
 16895 -16896 -16897  0
c  -3 does not represent an automaton state.
c    -( b^{50, 14}_2 ∧  b^{50, 14}_1 ∧  b^{50, 14}_0 ∧ true) 
c  in CNF:
c    -b^{50, 14}_2 ∨ -b^{50, 14}_1 ∨ -b^{50, 14}_0 ∨ false 
c  in DIMACS:
-16895 -16896 -16897  0

c i = 15
c  -2+1 --> -1
c    ( b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧  p_750) -> ( b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0)
c  in CNF:
c    -b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨  b^{50, 16}_2
c    -b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_1
c    -b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨  b^{50, 16}_0
c  in DIMACS:
-16898 -16899  16900 -750  16901 0
-16898 -16899  16900 -750 -16902 0
-16898 -16899  16900 -750  16903 0

c  -1+1 --> 0
c    ( b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0 ∧  p_750) -> (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧ -b^{50, 16}_0)
c  in CNF:
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_2
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_1
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_0
c  in DIMACS:
-16898  16899 -16900 -750 -16901 0
-16898  16899 -16900 -750 -16902 0
-16898  16899 -16900 -750 -16903 0

c  0+1 --> 1
c    (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧  p_750) -> (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0)
c  in CNF:
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_2
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_1
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨  b^{50, 16}_0
c  in DIMACS:
 16898  16899  16900 -750 -16901 0
 16898  16899  16900 -750 -16902 0
 16898  16899  16900 -750  16903 0

c  1+1 --> 2
c    (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0 ∧  p_750) -> (-b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0)
c  in CNF:
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_2
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨  b^{50, 16}_1
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ -p_750 ∨ -b^{50, 16}_0
c  in DIMACS:
 16898  16899 -16900 -750 -16901 0
 16898  16899 -16900 -750  16902 0
 16898  16899 -16900 -750 -16903 0

c  2+1 --> break 
c    (-b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧  p_750) -> break
c  in CNF:
c     b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 16898 -16899  16900 -750 1162 0


c  2-1 --> 1
c    (-b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧ -p_750) -> (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0)
c  in CNF:
c     b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_2
c     b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_1
c     b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨  b^{50, 16}_0
c  in DIMACS:
 16898 -16899  16900  750 -16901 0
 16898 -16899  16900  750 -16902 0
 16898 -16899  16900  750  16903 0

c  1-1 --> 0
c    (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0 ∧ -p_750) -> (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧ -b^{50, 16}_0)
c  in CNF:
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_2
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_1
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_0
c  in DIMACS:
 16898  16899 -16900  750 -16901 0
 16898  16899 -16900  750 -16902 0
 16898  16899 -16900  750 -16903 0

c  0-1 --> -1
c    (-b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧ -p_750) -> ( b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0)
c  in CNF:
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨  b^{50, 16}_2
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_1
c     b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨  b^{50, 16}_0
c  in DIMACS:
 16898  16899  16900  750  16901 0
 16898  16899  16900  750 -16902 0
 16898  16899  16900  750  16903 0

c  -1-1 --> -2
c    ( b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧  b^{50, 15}_0 ∧ -p_750) -> ( b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0)
c  in CNF:
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨  b^{50, 16}_2
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨  b^{50, 16}_1
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨  p_750 ∨ -b^{50, 16}_0
c  in DIMACS:
-16898  16899 -16900  750  16901 0
-16898  16899 -16900  750  16902 0
-16898  16899 -16900  750 -16903 0

c  -2-1 --> break 
c    ( b^{50, 15}_2 ∧  b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨  b^{50, 15}_0 ∨  p_750 ∨ break
c  in DIMACS:
-16898 -16899  16900  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 15}_2 ∧ -b^{50, 15}_1 ∧ -b^{50, 15}_0 ∧ true) 
c  in CNF:
c    -b^{50, 15}_2 ∨  b^{50, 15}_1 ∨  b^{50, 15}_0 ∨ false 
c  in DIMACS:
-16898  16899  16900  0

c  3 does not represent an automaton state.
c    -(-b^{50, 15}_2 ∧  b^{50, 15}_1 ∧  b^{50, 15}_0 ∧ true) 
c  in CNF:
c     b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ false 
c  in DIMACS:
 16898 -16899 -16900  0
c  -3 does not represent an automaton state.
c    -( b^{50, 15}_2 ∧  b^{50, 15}_1 ∧  b^{50, 15}_0 ∧ true) 
c  in CNF:
c    -b^{50, 15}_2 ∨ -b^{50, 15}_1 ∨ -b^{50, 15}_0 ∨ false 
c  in DIMACS:
-16898 -16899 -16900  0

c i = 16
c  -2+1 --> -1
c    ( b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧  p_800) -> ( b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0)
c  in CNF:
c    -b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨  b^{50, 17}_2
c    -b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_1
c    -b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨  b^{50, 17}_0
c  in DIMACS:
-16901 -16902  16903 -800  16904 0
-16901 -16902  16903 -800 -16905 0
-16901 -16902  16903 -800  16906 0

c  -1+1 --> 0
c    ( b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0 ∧  p_800) -> (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧ -b^{50, 17}_0)
c  in CNF:
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_2
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_1
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_0
c  in DIMACS:
-16901  16902 -16903 -800 -16904 0
-16901  16902 -16903 -800 -16905 0
-16901  16902 -16903 -800 -16906 0

c  0+1 --> 1
c    (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧  p_800) -> (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0)
c  in CNF:
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_2
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_1
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨  b^{50, 17}_0
c  in DIMACS:
 16901  16902  16903 -800 -16904 0
 16901  16902  16903 -800 -16905 0
 16901  16902  16903 -800  16906 0

c  1+1 --> 2
c    (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0 ∧  p_800) -> (-b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0)
c  in CNF:
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_2
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨  b^{50, 17}_1
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ -p_800 ∨ -b^{50, 17}_0
c  in DIMACS:
 16901  16902 -16903 -800 -16904 0
 16901  16902 -16903 -800  16905 0
 16901  16902 -16903 -800 -16906 0

c  2+1 --> break 
c    (-b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧  p_800) -> break
c  in CNF:
c     b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 16901 -16902  16903 -800 1162 0


c  2-1 --> 1
c    (-b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧ -p_800) -> (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0)
c  in CNF:
c     b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_2
c     b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_1
c     b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨  b^{50, 17}_0
c  in DIMACS:
 16901 -16902  16903  800 -16904 0
 16901 -16902  16903  800 -16905 0
 16901 -16902  16903  800  16906 0

c  1-1 --> 0
c    (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0 ∧ -p_800) -> (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧ -b^{50, 17}_0)
c  in CNF:
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_2
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_1
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_0
c  in DIMACS:
 16901  16902 -16903  800 -16904 0
 16901  16902 -16903  800 -16905 0
 16901  16902 -16903  800 -16906 0

c  0-1 --> -1
c    (-b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧ -p_800) -> ( b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0)
c  in CNF:
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨  b^{50, 17}_2
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_1
c     b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨  b^{50, 17}_0
c  in DIMACS:
 16901  16902  16903  800  16904 0
 16901  16902  16903  800 -16905 0
 16901  16902  16903  800  16906 0

c  -1-1 --> -2
c    ( b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧  b^{50, 16}_0 ∧ -p_800) -> ( b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0)
c  in CNF:
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨  b^{50, 17}_2
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨  b^{50, 17}_1
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨  p_800 ∨ -b^{50, 17}_0
c  in DIMACS:
-16901  16902 -16903  800  16904 0
-16901  16902 -16903  800  16905 0
-16901  16902 -16903  800 -16906 0

c  -2-1 --> break 
c    ( b^{50, 16}_2 ∧  b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨  b^{50, 16}_0 ∨  p_800 ∨ break
c  in DIMACS:
-16901 -16902  16903  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 16}_2 ∧ -b^{50, 16}_1 ∧ -b^{50, 16}_0 ∧ true) 
c  in CNF:
c    -b^{50, 16}_2 ∨  b^{50, 16}_1 ∨  b^{50, 16}_0 ∨ false 
c  in DIMACS:
-16901  16902  16903  0

c  3 does not represent an automaton state.
c    -(-b^{50, 16}_2 ∧  b^{50, 16}_1 ∧  b^{50, 16}_0 ∧ true) 
c  in CNF:
c     b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ false 
c  in DIMACS:
 16901 -16902 -16903  0
c  -3 does not represent an automaton state.
c    -( b^{50, 16}_2 ∧  b^{50, 16}_1 ∧  b^{50, 16}_0 ∧ true) 
c  in CNF:
c    -b^{50, 16}_2 ∨ -b^{50, 16}_1 ∨ -b^{50, 16}_0 ∨ false 
c  in DIMACS:
-16901 -16902 -16903  0

c i = 17
c  -2+1 --> -1
c    ( b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧  p_850) -> ( b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0)
c  in CNF:
c    -b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨  b^{50, 18}_2
c    -b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_1
c    -b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨  b^{50, 18}_0
c  in DIMACS:
-16904 -16905  16906 -850  16907 0
-16904 -16905  16906 -850 -16908 0
-16904 -16905  16906 -850  16909 0

c  -1+1 --> 0
c    ( b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0 ∧  p_850) -> (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧ -b^{50, 18}_0)
c  in CNF:
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_2
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_1
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_0
c  in DIMACS:
-16904  16905 -16906 -850 -16907 0
-16904  16905 -16906 -850 -16908 0
-16904  16905 -16906 -850 -16909 0

c  0+1 --> 1
c    (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧  p_850) -> (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0)
c  in CNF:
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_2
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_1
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨  b^{50, 18}_0
c  in DIMACS:
 16904  16905  16906 -850 -16907 0
 16904  16905  16906 -850 -16908 0
 16904  16905  16906 -850  16909 0

c  1+1 --> 2
c    (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0 ∧  p_850) -> (-b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0)
c  in CNF:
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_2
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨  b^{50, 18}_1
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ -p_850 ∨ -b^{50, 18}_0
c  in DIMACS:
 16904  16905 -16906 -850 -16907 0
 16904  16905 -16906 -850  16908 0
 16904  16905 -16906 -850 -16909 0

c  2+1 --> break 
c    (-b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧  p_850) -> break
c  in CNF:
c     b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 16904 -16905  16906 -850 1162 0


c  2-1 --> 1
c    (-b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧ -p_850) -> (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0)
c  in CNF:
c     b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_2
c     b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_1
c     b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨  b^{50, 18}_0
c  in DIMACS:
 16904 -16905  16906  850 -16907 0
 16904 -16905  16906  850 -16908 0
 16904 -16905  16906  850  16909 0

c  1-1 --> 0
c    (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0 ∧ -p_850) -> (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧ -b^{50, 18}_0)
c  in CNF:
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_2
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_1
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_0
c  in DIMACS:
 16904  16905 -16906  850 -16907 0
 16904  16905 -16906  850 -16908 0
 16904  16905 -16906  850 -16909 0

c  0-1 --> -1
c    (-b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧ -p_850) -> ( b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0)
c  in CNF:
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨  b^{50, 18}_2
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_1
c     b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨  b^{50, 18}_0
c  in DIMACS:
 16904  16905  16906  850  16907 0
 16904  16905  16906  850 -16908 0
 16904  16905  16906  850  16909 0

c  -1-1 --> -2
c    ( b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧  b^{50, 17}_0 ∧ -p_850) -> ( b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0)
c  in CNF:
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨  b^{50, 18}_2
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨  b^{50, 18}_1
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨  p_850 ∨ -b^{50, 18}_0
c  in DIMACS:
-16904  16905 -16906  850  16907 0
-16904  16905 -16906  850  16908 0
-16904  16905 -16906  850 -16909 0

c  -2-1 --> break 
c    ( b^{50, 17}_2 ∧  b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨  b^{50, 17}_0 ∨  p_850 ∨ break
c  in DIMACS:
-16904 -16905  16906  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 17}_2 ∧ -b^{50, 17}_1 ∧ -b^{50, 17}_0 ∧ true) 
c  in CNF:
c    -b^{50, 17}_2 ∨  b^{50, 17}_1 ∨  b^{50, 17}_0 ∨ false 
c  in DIMACS:
-16904  16905  16906  0

c  3 does not represent an automaton state.
c    -(-b^{50, 17}_2 ∧  b^{50, 17}_1 ∧  b^{50, 17}_0 ∧ true) 
c  in CNF:
c     b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ false 
c  in DIMACS:
 16904 -16905 -16906  0
c  -3 does not represent an automaton state.
c    -( b^{50, 17}_2 ∧  b^{50, 17}_1 ∧  b^{50, 17}_0 ∧ true) 
c  in CNF:
c    -b^{50, 17}_2 ∨ -b^{50, 17}_1 ∨ -b^{50, 17}_0 ∨ false 
c  in DIMACS:
-16904 -16905 -16906  0

c i = 18
c  -2+1 --> -1
c    ( b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧  p_900) -> ( b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0)
c  in CNF:
c    -b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨  b^{50, 19}_2
c    -b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_1
c    -b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨  b^{50, 19}_0
c  in DIMACS:
-16907 -16908  16909 -900  16910 0
-16907 -16908  16909 -900 -16911 0
-16907 -16908  16909 -900  16912 0

c  -1+1 --> 0
c    ( b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0 ∧  p_900) -> (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧ -b^{50, 19}_0)
c  in CNF:
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_2
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_1
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_0
c  in DIMACS:
-16907  16908 -16909 -900 -16910 0
-16907  16908 -16909 -900 -16911 0
-16907  16908 -16909 -900 -16912 0

c  0+1 --> 1
c    (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧  p_900) -> (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0)
c  in CNF:
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_2
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_1
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨  b^{50, 19}_0
c  in DIMACS:
 16907  16908  16909 -900 -16910 0
 16907  16908  16909 -900 -16911 0
 16907  16908  16909 -900  16912 0

c  1+1 --> 2
c    (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0 ∧  p_900) -> (-b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0)
c  in CNF:
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_2
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨  b^{50, 19}_1
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ -p_900 ∨ -b^{50, 19}_0
c  in DIMACS:
 16907  16908 -16909 -900 -16910 0
 16907  16908 -16909 -900  16911 0
 16907  16908 -16909 -900 -16912 0

c  2+1 --> break 
c    (-b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧  p_900) -> break
c  in CNF:
c     b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 16907 -16908  16909 -900 1162 0


c  2-1 --> 1
c    (-b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧ -p_900) -> (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0)
c  in CNF:
c     b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_2
c     b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_1
c     b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨  b^{50, 19}_0
c  in DIMACS:
 16907 -16908  16909  900 -16910 0
 16907 -16908  16909  900 -16911 0
 16907 -16908  16909  900  16912 0

c  1-1 --> 0
c    (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0 ∧ -p_900) -> (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧ -b^{50, 19}_0)
c  in CNF:
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_2
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_1
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_0
c  in DIMACS:
 16907  16908 -16909  900 -16910 0
 16907  16908 -16909  900 -16911 0
 16907  16908 -16909  900 -16912 0

c  0-1 --> -1
c    (-b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧ -p_900) -> ( b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0)
c  in CNF:
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨  b^{50, 19}_2
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_1
c     b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨  b^{50, 19}_0
c  in DIMACS:
 16907  16908  16909  900  16910 0
 16907  16908  16909  900 -16911 0
 16907  16908  16909  900  16912 0

c  -1-1 --> -2
c    ( b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧  b^{50, 18}_0 ∧ -p_900) -> ( b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0)
c  in CNF:
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨  b^{50, 19}_2
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨  b^{50, 19}_1
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨  p_900 ∨ -b^{50, 19}_0
c  in DIMACS:
-16907  16908 -16909  900  16910 0
-16907  16908 -16909  900  16911 0
-16907  16908 -16909  900 -16912 0

c  -2-1 --> break 
c    ( b^{50, 18}_2 ∧  b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨  b^{50, 18}_0 ∨  p_900 ∨ break
c  in DIMACS:
-16907 -16908  16909  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 18}_2 ∧ -b^{50, 18}_1 ∧ -b^{50, 18}_0 ∧ true) 
c  in CNF:
c    -b^{50, 18}_2 ∨  b^{50, 18}_1 ∨  b^{50, 18}_0 ∨ false 
c  in DIMACS:
-16907  16908  16909  0

c  3 does not represent an automaton state.
c    -(-b^{50, 18}_2 ∧  b^{50, 18}_1 ∧  b^{50, 18}_0 ∧ true) 
c  in CNF:
c     b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ false 
c  in DIMACS:
 16907 -16908 -16909  0
c  -3 does not represent an automaton state.
c    -( b^{50, 18}_2 ∧  b^{50, 18}_1 ∧  b^{50, 18}_0 ∧ true) 
c  in CNF:
c    -b^{50, 18}_2 ∨ -b^{50, 18}_1 ∨ -b^{50, 18}_0 ∨ false 
c  in DIMACS:
-16907 -16908 -16909  0

c i = 19
c  -2+1 --> -1
c    ( b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧  p_950) -> ( b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0)
c  in CNF:
c    -b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨  b^{50, 20}_2
c    -b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_1
c    -b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨  b^{50, 20}_0
c  in DIMACS:
-16910 -16911  16912 -950  16913 0
-16910 -16911  16912 -950 -16914 0
-16910 -16911  16912 -950  16915 0

c  -1+1 --> 0
c    ( b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0 ∧  p_950) -> (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧ -b^{50, 20}_0)
c  in CNF:
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_2
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_1
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_0
c  in DIMACS:
-16910  16911 -16912 -950 -16913 0
-16910  16911 -16912 -950 -16914 0
-16910  16911 -16912 -950 -16915 0

c  0+1 --> 1
c    (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧  p_950) -> (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0)
c  in CNF:
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_2
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_1
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨  b^{50, 20}_0
c  in DIMACS:
 16910  16911  16912 -950 -16913 0
 16910  16911  16912 -950 -16914 0
 16910  16911  16912 -950  16915 0

c  1+1 --> 2
c    (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0 ∧  p_950) -> (-b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0)
c  in CNF:
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_2
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨  b^{50, 20}_1
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ -p_950 ∨ -b^{50, 20}_0
c  in DIMACS:
 16910  16911 -16912 -950 -16913 0
 16910  16911 -16912 -950  16914 0
 16910  16911 -16912 -950 -16915 0

c  2+1 --> break 
c    (-b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧  p_950) -> break
c  in CNF:
c     b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 16910 -16911  16912 -950 1162 0


c  2-1 --> 1
c    (-b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧ -p_950) -> (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0)
c  in CNF:
c     b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_2
c     b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_1
c     b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨  b^{50, 20}_0
c  in DIMACS:
 16910 -16911  16912  950 -16913 0
 16910 -16911  16912  950 -16914 0
 16910 -16911  16912  950  16915 0

c  1-1 --> 0
c    (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0 ∧ -p_950) -> (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧ -b^{50, 20}_0)
c  in CNF:
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_2
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_1
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_0
c  in DIMACS:
 16910  16911 -16912  950 -16913 0
 16910  16911 -16912  950 -16914 0
 16910  16911 -16912  950 -16915 0

c  0-1 --> -1
c    (-b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧ -p_950) -> ( b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0)
c  in CNF:
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨  b^{50, 20}_2
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_1
c     b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨  b^{50, 20}_0
c  in DIMACS:
 16910  16911  16912  950  16913 0
 16910  16911  16912  950 -16914 0
 16910  16911  16912  950  16915 0

c  -1-1 --> -2
c    ( b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧  b^{50, 19}_0 ∧ -p_950) -> ( b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0)
c  in CNF:
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨  b^{50, 20}_2
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨  b^{50, 20}_1
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨  p_950 ∨ -b^{50, 20}_0
c  in DIMACS:
-16910  16911 -16912  950  16913 0
-16910  16911 -16912  950  16914 0
-16910  16911 -16912  950 -16915 0

c  -2-1 --> break 
c    ( b^{50, 19}_2 ∧  b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨  b^{50, 19}_0 ∨  p_950 ∨ break
c  in DIMACS:
-16910 -16911  16912  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 19}_2 ∧ -b^{50, 19}_1 ∧ -b^{50, 19}_0 ∧ true) 
c  in CNF:
c    -b^{50, 19}_2 ∨  b^{50, 19}_1 ∨  b^{50, 19}_0 ∨ false 
c  in DIMACS:
-16910  16911  16912  0

c  3 does not represent an automaton state.
c    -(-b^{50, 19}_2 ∧  b^{50, 19}_1 ∧  b^{50, 19}_0 ∧ true) 
c  in CNF:
c     b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ false 
c  in DIMACS:
 16910 -16911 -16912  0
c  -3 does not represent an automaton state.
c    -( b^{50, 19}_2 ∧  b^{50, 19}_1 ∧  b^{50, 19}_0 ∧ true) 
c  in CNF:
c    -b^{50, 19}_2 ∨ -b^{50, 19}_1 ∨ -b^{50, 19}_0 ∨ false 
c  in DIMACS:
-16910 -16911 -16912  0

c i = 20
c  -2+1 --> -1
c    ( b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧  p_1000) -> ( b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0)
c  in CNF:
c    -b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨  b^{50, 21}_2
c    -b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_1
c    -b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨  b^{50, 21}_0
c  in DIMACS:
-16913 -16914  16915 -1000  16916 0
-16913 -16914  16915 -1000 -16917 0
-16913 -16914  16915 -1000  16918 0

c  -1+1 --> 0
c    ( b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0 ∧  p_1000) -> (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧ -b^{50, 21}_0)
c  in CNF:
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_2
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_1
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_0
c  in DIMACS:
-16913  16914 -16915 -1000 -16916 0
-16913  16914 -16915 -1000 -16917 0
-16913  16914 -16915 -1000 -16918 0

c  0+1 --> 1
c    (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧  p_1000) -> (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0)
c  in CNF:
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_2
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_1
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨  b^{50, 21}_0
c  in DIMACS:
 16913  16914  16915 -1000 -16916 0
 16913  16914  16915 -1000 -16917 0
 16913  16914  16915 -1000  16918 0

c  1+1 --> 2
c    (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0 ∧  p_1000) -> (-b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0)
c  in CNF:
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_2
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨  b^{50, 21}_1
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ -p_1000 ∨ -b^{50, 21}_0
c  in DIMACS:
 16913  16914 -16915 -1000 -16916 0
 16913  16914 -16915 -1000  16917 0
 16913  16914 -16915 -1000 -16918 0

c  2+1 --> break 
c    (-b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 16913 -16914  16915 -1000 1162 0


c  2-1 --> 1
c    (-b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧ -p_1000) -> (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0)
c  in CNF:
c     b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_2
c     b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_1
c     b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨  b^{50, 21}_0
c  in DIMACS:
 16913 -16914  16915  1000 -16916 0
 16913 -16914  16915  1000 -16917 0
 16913 -16914  16915  1000  16918 0

c  1-1 --> 0
c    (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0 ∧ -p_1000) -> (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧ -b^{50, 21}_0)
c  in CNF:
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_2
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_1
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_0
c  in DIMACS:
 16913  16914 -16915  1000 -16916 0
 16913  16914 -16915  1000 -16917 0
 16913  16914 -16915  1000 -16918 0

c  0-1 --> -1
c    (-b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧ -p_1000) -> ( b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0)
c  in CNF:
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨  b^{50, 21}_2
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_1
c     b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨  b^{50, 21}_0
c  in DIMACS:
 16913  16914  16915  1000  16916 0
 16913  16914  16915  1000 -16917 0
 16913  16914  16915  1000  16918 0

c  -1-1 --> -2
c    ( b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧  b^{50, 20}_0 ∧ -p_1000) -> ( b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0)
c  in CNF:
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨  b^{50, 21}_2
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨  b^{50, 21}_1
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨  p_1000 ∨ -b^{50, 21}_0
c  in DIMACS:
-16913  16914 -16915  1000  16916 0
-16913  16914 -16915  1000  16917 0
-16913  16914 -16915  1000 -16918 0

c  -2-1 --> break 
c    ( b^{50, 20}_2 ∧  b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨  b^{50, 20}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-16913 -16914  16915  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 20}_2 ∧ -b^{50, 20}_1 ∧ -b^{50, 20}_0 ∧ true) 
c  in CNF:
c    -b^{50, 20}_2 ∨  b^{50, 20}_1 ∨  b^{50, 20}_0 ∨ false 
c  in DIMACS:
-16913  16914  16915  0

c  3 does not represent an automaton state.
c    -(-b^{50, 20}_2 ∧  b^{50, 20}_1 ∧  b^{50, 20}_0 ∧ true) 
c  in CNF:
c     b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ false 
c  in DIMACS:
 16913 -16914 -16915  0
c  -3 does not represent an automaton state.
c    -( b^{50, 20}_2 ∧  b^{50, 20}_1 ∧  b^{50, 20}_0 ∧ true) 
c  in CNF:
c    -b^{50, 20}_2 ∨ -b^{50, 20}_1 ∨ -b^{50, 20}_0 ∨ false 
c  in DIMACS:
-16913 -16914 -16915  0

c i = 21
c  -2+1 --> -1
c    ( b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧  p_1050) -> ( b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0)
c  in CNF:
c    -b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨  b^{50, 22}_2
c    -b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_1
c    -b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨  b^{50, 22}_0
c  in DIMACS:
-16916 -16917  16918 -1050  16919 0
-16916 -16917  16918 -1050 -16920 0
-16916 -16917  16918 -1050  16921 0

c  -1+1 --> 0
c    ( b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0 ∧  p_1050) -> (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧ -b^{50, 22}_0)
c  in CNF:
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_2
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_1
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_0
c  in DIMACS:
-16916  16917 -16918 -1050 -16919 0
-16916  16917 -16918 -1050 -16920 0
-16916  16917 -16918 -1050 -16921 0

c  0+1 --> 1
c    (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧  p_1050) -> (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0)
c  in CNF:
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_2
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_1
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨  b^{50, 22}_0
c  in DIMACS:
 16916  16917  16918 -1050 -16919 0
 16916  16917  16918 -1050 -16920 0
 16916  16917  16918 -1050  16921 0

c  1+1 --> 2
c    (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0 ∧  p_1050) -> (-b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0)
c  in CNF:
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_2
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨  b^{50, 22}_1
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ -p_1050 ∨ -b^{50, 22}_0
c  in DIMACS:
 16916  16917 -16918 -1050 -16919 0
 16916  16917 -16918 -1050  16920 0
 16916  16917 -16918 -1050 -16921 0

c  2+1 --> break 
c    (-b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 16916 -16917  16918 -1050 1162 0


c  2-1 --> 1
c    (-b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧ -p_1050) -> (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0)
c  in CNF:
c     b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_2
c     b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_1
c     b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨  b^{50, 22}_0
c  in DIMACS:
 16916 -16917  16918  1050 -16919 0
 16916 -16917  16918  1050 -16920 0
 16916 -16917  16918  1050  16921 0

c  1-1 --> 0
c    (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0 ∧ -p_1050) -> (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧ -b^{50, 22}_0)
c  in CNF:
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_2
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_1
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_0
c  in DIMACS:
 16916  16917 -16918  1050 -16919 0
 16916  16917 -16918  1050 -16920 0
 16916  16917 -16918  1050 -16921 0

c  0-1 --> -1
c    (-b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧ -p_1050) -> ( b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0)
c  in CNF:
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨  b^{50, 22}_2
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_1
c     b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨  b^{50, 22}_0
c  in DIMACS:
 16916  16917  16918  1050  16919 0
 16916  16917  16918  1050 -16920 0
 16916  16917  16918  1050  16921 0

c  -1-1 --> -2
c    ( b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧  b^{50, 21}_0 ∧ -p_1050) -> ( b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0)
c  in CNF:
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨  b^{50, 22}_2
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨  b^{50, 22}_1
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨  p_1050 ∨ -b^{50, 22}_0
c  in DIMACS:
-16916  16917 -16918  1050  16919 0
-16916  16917 -16918  1050  16920 0
-16916  16917 -16918  1050 -16921 0

c  -2-1 --> break 
c    ( b^{50, 21}_2 ∧  b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨  b^{50, 21}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-16916 -16917  16918  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 21}_2 ∧ -b^{50, 21}_1 ∧ -b^{50, 21}_0 ∧ true) 
c  in CNF:
c    -b^{50, 21}_2 ∨  b^{50, 21}_1 ∨  b^{50, 21}_0 ∨ false 
c  in DIMACS:
-16916  16917  16918  0

c  3 does not represent an automaton state.
c    -(-b^{50, 21}_2 ∧  b^{50, 21}_1 ∧  b^{50, 21}_0 ∧ true) 
c  in CNF:
c     b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ false 
c  in DIMACS:
 16916 -16917 -16918  0
c  -3 does not represent an automaton state.
c    -( b^{50, 21}_2 ∧  b^{50, 21}_1 ∧  b^{50, 21}_0 ∧ true) 
c  in CNF:
c    -b^{50, 21}_2 ∨ -b^{50, 21}_1 ∨ -b^{50, 21}_0 ∨ false 
c  in DIMACS:
-16916 -16917 -16918  0

c i = 22
c  -2+1 --> -1
c    ( b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧  p_1100) -> ( b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0)
c  in CNF:
c    -b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨  b^{50, 23}_2
c    -b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_1
c    -b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨  b^{50, 23}_0
c  in DIMACS:
-16919 -16920  16921 -1100  16922 0
-16919 -16920  16921 -1100 -16923 0
-16919 -16920  16921 -1100  16924 0

c  -1+1 --> 0
c    ( b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0 ∧  p_1100) -> (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧ -b^{50, 23}_0)
c  in CNF:
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_2
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_1
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_0
c  in DIMACS:
-16919  16920 -16921 -1100 -16922 0
-16919  16920 -16921 -1100 -16923 0
-16919  16920 -16921 -1100 -16924 0

c  0+1 --> 1
c    (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧  p_1100) -> (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0)
c  in CNF:
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_2
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_1
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨  b^{50, 23}_0
c  in DIMACS:
 16919  16920  16921 -1100 -16922 0
 16919  16920  16921 -1100 -16923 0
 16919  16920  16921 -1100  16924 0

c  1+1 --> 2
c    (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0 ∧  p_1100) -> (-b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0)
c  in CNF:
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_2
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨  b^{50, 23}_1
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ -p_1100 ∨ -b^{50, 23}_0
c  in DIMACS:
 16919  16920 -16921 -1100 -16922 0
 16919  16920 -16921 -1100  16923 0
 16919  16920 -16921 -1100 -16924 0

c  2+1 --> break 
c    (-b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 16919 -16920  16921 -1100 1162 0


c  2-1 --> 1
c    (-b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧ -p_1100) -> (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0)
c  in CNF:
c     b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_2
c     b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_1
c     b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨  b^{50, 23}_0
c  in DIMACS:
 16919 -16920  16921  1100 -16922 0
 16919 -16920  16921  1100 -16923 0
 16919 -16920  16921  1100  16924 0

c  1-1 --> 0
c    (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0 ∧ -p_1100) -> (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧ -b^{50, 23}_0)
c  in CNF:
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_2
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_1
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_0
c  in DIMACS:
 16919  16920 -16921  1100 -16922 0
 16919  16920 -16921  1100 -16923 0
 16919  16920 -16921  1100 -16924 0

c  0-1 --> -1
c    (-b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧ -p_1100) -> ( b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0)
c  in CNF:
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨  b^{50, 23}_2
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_1
c     b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨  b^{50, 23}_0
c  in DIMACS:
 16919  16920  16921  1100  16922 0
 16919  16920  16921  1100 -16923 0
 16919  16920  16921  1100  16924 0

c  -1-1 --> -2
c    ( b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧  b^{50, 22}_0 ∧ -p_1100) -> ( b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0)
c  in CNF:
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨  b^{50, 23}_2
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨  b^{50, 23}_1
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨  p_1100 ∨ -b^{50, 23}_0
c  in DIMACS:
-16919  16920 -16921  1100  16922 0
-16919  16920 -16921  1100  16923 0
-16919  16920 -16921  1100 -16924 0

c  -2-1 --> break 
c    ( b^{50, 22}_2 ∧  b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨  b^{50, 22}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-16919 -16920  16921  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 22}_2 ∧ -b^{50, 22}_1 ∧ -b^{50, 22}_0 ∧ true) 
c  in CNF:
c    -b^{50, 22}_2 ∨  b^{50, 22}_1 ∨  b^{50, 22}_0 ∨ false 
c  in DIMACS:
-16919  16920  16921  0

c  3 does not represent an automaton state.
c    -(-b^{50, 22}_2 ∧  b^{50, 22}_1 ∧  b^{50, 22}_0 ∧ true) 
c  in CNF:
c     b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ false 
c  in DIMACS:
 16919 -16920 -16921  0
c  -3 does not represent an automaton state.
c    -( b^{50, 22}_2 ∧  b^{50, 22}_1 ∧  b^{50, 22}_0 ∧ true) 
c  in CNF:
c    -b^{50, 22}_2 ∨ -b^{50, 22}_1 ∨ -b^{50, 22}_0 ∨ false 
c  in DIMACS:
-16919 -16920 -16921  0

c i = 23
c  -2+1 --> -1
c    ( b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧  p_1150) -> ( b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧  b^{50, 24}_0)
c  in CNF:
c    -b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨  b^{50, 24}_2
c    -b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_1
c    -b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨  b^{50, 24}_0
c  in DIMACS:
-16922 -16923  16924 -1150  16925 0
-16922 -16923  16924 -1150 -16926 0
-16922 -16923  16924 -1150  16927 0

c  -1+1 --> 0
c    ( b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0 ∧  p_1150) -> (-b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧ -b^{50, 24}_0)
c  in CNF:
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_2
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_1
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_0
c  in DIMACS:
-16922  16923 -16924 -1150 -16925 0
-16922  16923 -16924 -1150 -16926 0
-16922  16923 -16924 -1150 -16927 0

c  0+1 --> 1
c    (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧  p_1150) -> (-b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧  b^{50, 24}_0)
c  in CNF:
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_2
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_1
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨  b^{50, 24}_0
c  in DIMACS:
 16922  16923  16924 -1150 -16925 0
 16922  16923  16924 -1150 -16926 0
 16922  16923  16924 -1150  16927 0

c  1+1 --> 2
c    (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0 ∧  p_1150) -> (-b^{50, 24}_2 ∧  b^{50, 24}_1 ∧ -b^{50, 24}_0)
c  in CNF:
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_2
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨  b^{50, 24}_1
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ -p_1150 ∨ -b^{50, 24}_0
c  in DIMACS:
 16922  16923 -16924 -1150 -16925 0
 16922  16923 -16924 -1150  16926 0
 16922  16923 -16924 -1150 -16927 0

c  2+1 --> break 
c    (-b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 16922 -16923  16924 -1150 1162 0


c  2-1 --> 1
c    (-b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧ -p_1150) -> (-b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧  b^{50, 24}_0)
c  in CNF:
c     b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_2
c     b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_1
c     b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨  b^{50, 24}_0
c  in DIMACS:
 16922 -16923  16924  1150 -16925 0
 16922 -16923  16924  1150 -16926 0
 16922 -16923  16924  1150  16927 0

c  1-1 --> 0
c    (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0 ∧ -p_1150) -> (-b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧ -b^{50, 24}_0)
c  in CNF:
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_2
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_1
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_0
c  in DIMACS:
 16922  16923 -16924  1150 -16925 0
 16922  16923 -16924  1150 -16926 0
 16922  16923 -16924  1150 -16927 0

c  0-1 --> -1
c    (-b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧ -p_1150) -> ( b^{50, 24}_2 ∧ -b^{50, 24}_1 ∧  b^{50, 24}_0)
c  in CNF:
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨  b^{50, 24}_2
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_1
c     b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨  b^{50, 24}_0
c  in DIMACS:
 16922  16923  16924  1150  16925 0
 16922  16923  16924  1150 -16926 0
 16922  16923  16924  1150  16927 0

c  -1-1 --> -2
c    ( b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧  b^{50, 23}_0 ∧ -p_1150) -> ( b^{50, 24}_2 ∧  b^{50, 24}_1 ∧ -b^{50, 24}_0)
c  in CNF:
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨  b^{50, 24}_2
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨  b^{50, 24}_1
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨  p_1150 ∨ -b^{50, 24}_0
c  in DIMACS:
-16922  16923 -16924  1150  16925 0
-16922  16923 -16924  1150  16926 0
-16922  16923 -16924  1150 -16927 0

c  -2-1 --> break 
c    ( b^{50, 23}_2 ∧  b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨  b^{50, 23}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-16922 -16923  16924  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{50, 23}_2 ∧ -b^{50, 23}_1 ∧ -b^{50, 23}_0 ∧ true) 
c  in CNF:
c    -b^{50, 23}_2 ∨  b^{50, 23}_1 ∨  b^{50, 23}_0 ∨ false 
c  in DIMACS:
-16922  16923  16924  0

c  3 does not represent an automaton state.
c    -(-b^{50, 23}_2 ∧  b^{50, 23}_1 ∧  b^{50, 23}_0 ∧ true) 
c  in CNF:
c     b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ false 
c  in DIMACS:
 16922 -16923 -16924  0
c  -3 does not represent an automaton state.
c    -( b^{50, 23}_2 ∧  b^{50, 23}_1 ∧  b^{50, 23}_0 ∧ true) 
c  in CNF:
c    -b^{50, 23}_2 ∨ -b^{50, 23}_1 ∨ -b^{50, 23}_0 ∨ false 
c  in DIMACS:
-16922 -16923 -16924  0

c INIT for k = 51
c    -b^{51, 1}_2
c    -b^{51, 1}_1
c    -b^{51, 1}_0
c  in DIMACS:
-16928 0
-16929 0
-16930 0

c Transitions for k = 51
c i = 1
c  -2+1 --> -1
c    ( b^{51, 1}_2 ∧  b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧  p_51) -> ( b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0)
c  in CNF:
c    -b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨  b^{51, 2}_2
c    -b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_1
c    -b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨  b^{51, 2}_0
c  in DIMACS:
-16928 -16929  16930 -51  16931 0
-16928 -16929  16930 -51 -16932 0
-16928 -16929  16930 -51  16933 0

c  -1+1 --> 0
c    ( b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧  b^{51, 1}_0 ∧  p_51) -> (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧ -b^{51, 2}_0)
c  in CNF:
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_2
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_1
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_0
c  in DIMACS:
-16928  16929 -16930 -51 -16931 0
-16928  16929 -16930 -51 -16932 0
-16928  16929 -16930 -51 -16933 0

c  0+1 --> 1
c    (-b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧  p_51) -> (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0)
c  in CNF:
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_2
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_1
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨  b^{51, 2}_0
c  in DIMACS:
 16928  16929  16930 -51 -16931 0
 16928  16929  16930 -51 -16932 0
 16928  16929  16930 -51  16933 0

c  1+1 --> 2
c    (-b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧  b^{51, 1}_0 ∧  p_51) -> (-b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0)
c  in CNF:
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_2
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨  b^{51, 2}_1
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ -p_51 ∨ -b^{51, 2}_0
c  in DIMACS:
 16928  16929 -16930 -51 -16931 0
 16928  16929 -16930 -51  16932 0
 16928  16929 -16930 -51 -16933 0

c  2+1 --> break 
c    (-b^{51, 1}_2 ∧  b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧  p_51) -> break
c  in CNF:
c     b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ -p_51 ∨ break
c  in DIMACS:
 16928 -16929  16930 -51 1162 0


c  2-1 --> 1
c    (-b^{51, 1}_2 ∧  b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧ -p_51) -> (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0)
c  in CNF:
c     b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_2
c     b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_1
c     b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨  b^{51, 2}_0
c  in DIMACS:
 16928 -16929  16930  51 -16931 0
 16928 -16929  16930  51 -16932 0
 16928 -16929  16930  51  16933 0

c  1-1 --> 0
c    (-b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧  b^{51, 1}_0 ∧ -p_51) -> (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧ -b^{51, 2}_0)
c  in CNF:
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_2
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_1
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_0
c  in DIMACS:
 16928  16929 -16930  51 -16931 0
 16928  16929 -16930  51 -16932 0
 16928  16929 -16930  51 -16933 0

c  0-1 --> -1
c    (-b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧ -p_51) -> ( b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0)
c  in CNF:
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨  b^{51, 2}_2
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_1
c     b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨  b^{51, 2}_0
c  in DIMACS:
 16928  16929  16930  51  16931 0
 16928  16929  16930  51 -16932 0
 16928  16929  16930  51  16933 0

c  -1-1 --> -2
c    ( b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧  b^{51, 1}_0 ∧ -p_51) -> ( b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0)
c  in CNF:
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨  b^{51, 2}_2
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨  b^{51, 2}_1
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨  p_51 ∨ -b^{51, 2}_0
c  in DIMACS:
-16928  16929 -16930  51  16931 0
-16928  16929 -16930  51  16932 0
-16928  16929 -16930  51 -16933 0

c  -2-1 --> break 
c    ( b^{51, 1}_2 ∧  b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧ -p_51) -> break
c  in CNF:
c    -b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨  b^{51, 1}_0 ∨  p_51 ∨ break
c  in DIMACS:
-16928 -16929  16930  51 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 1}_2 ∧ -b^{51, 1}_1 ∧ -b^{51, 1}_0 ∧ true) 
c  in CNF:
c    -b^{51, 1}_2 ∨  b^{51, 1}_1 ∨  b^{51, 1}_0 ∨ false 
c  in DIMACS:
-16928  16929  16930  0

c  3 does not represent an automaton state.
c    -(-b^{51, 1}_2 ∧  b^{51, 1}_1 ∧  b^{51, 1}_0 ∧ true) 
c  in CNF:
c     b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ false 
c  in DIMACS:
 16928 -16929 -16930  0
c  -3 does not represent an automaton state.
c    -( b^{51, 1}_2 ∧  b^{51, 1}_1 ∧  b^{51, 1}_0 ∧ true) 
c  in CNF:
c    -b^{51, 1}_2 ∨ -b^{51, 1}_1 ∨ -b^{51, 1}_0 ∨ false 
c  in DIMACS:
-16928 -16929 -16930  0

c i = 2
c  -2+1 --> -1
c    ( b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧  p_102) -> ( b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0)
c  in CNF:
c    -b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨  b^{51, 3}_2
c    -b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_1
c    -b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨  b^{51, 3}_0
c  in DIMACS:
-16931 -16932  16933 -102  16934 0
-16931 -16932  16933 -102 -16935 0
-16931 -16932  16933 -102  16936 0

c  -1+1 --> 0
c    ( b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0 ∧  p_102) -> (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧ -b^{51, 3}_0)
c  in CNF:
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_2
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_1
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_0
c  in DIMACS:
-16931  16932 -16933 -102 -16934 0
-16931  16932 -16933 -102 -16935 0
-16931  16932 -16933 -102 -16936 0

c  0+1 --> 1
c    (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧  p_102) -> (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0)
c  in CNF:
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_2
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_1
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨  b^{51, 3}_0
c  in DIMACS:
 16931  16932  16933 -102 -16934 0
 16931  16932  16933 -102 -16935 0
 16931  16932  16933 -102  16936 0

c  1+1 --> 2
c    (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0 ∧  p_102) -> (-b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0)
c  in CNF:
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_2
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨  b^{51, 3}_1
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ -p_102 ∨ -b^{51, 3}_0
c  in DIMACS:
 16931  16932 -16933 -102 -16934 0
 16931  16932 -16933 -102  16935 0
 16931  16932 -16933 -102 -16936 0

c  2+1 --> break 
c    (-b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧  p_102) -> break
c  in CNF:
c     b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 16931 -16932  16933 -102 1162 0


c  2-1 --> 1
c    (-b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧ -p_102) -> (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0)
c  in CNF:
c     b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_2
c     b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_1
c     b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨  b^{51, 3}_0
c  in DIMACS:
 16931 -16932  16933  102 -16934 0
 16931 -16932  16933  102 -16935 0
 16931 -16932  16933  102  16936 0

c  1-1 --> 0
c    (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0 ∧ -p_102) -> (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧ -b^{51, 3}_0)
c  in CNF:
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_2
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_1
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_0
c  in DIMACS:
 16931  16932 -16933  102 -16934 0
 16931  16932 -16933  102 -16935 0
 16931  16932 -16933  102 -16936 0

c  0-1 --> -1
c    (-b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧ -p_102) -> ( b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0)
c  in CNF:
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨  b^{51, 3}_2
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_1
c     b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨  b^{51, 3}_0
c  in DIMACS:
 16931  16932  16933  102  16934 0
 16931  16932  16933  102 -16935 0
 16931  16932  16933  102  16936 0

c  -1-1 --> -2
c    ( b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧  b^{51, 2}_0 ∧ -p_102) -> ( b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0)
c  in CNF:
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨  b^{51, 3}_2
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨  b^{51, 3}_1
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨  p_102 ∨ -b^{51, 3}_0
c  in DIMACS:
-16931  16932 -16933  102  16934 0
-16931  16932 -16933  102  16935 0
-16931  16932 -16933  102 -16936 0

c  -2-1 --> break 
c    ( b^{51, 2}_2 ∧  b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨  b^{51, 2}_0 ∨  p_102 ∨ break
c  in DIMACS:
-16931 -16932  16933  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 2}_2 ∧ -b^{51, 2}_1 ∧ -b^{51, 2}_0 ∧ true) 
c  in CNF:
c    -b^{51, 2}_2 ∨  b^{51, 2}_1 ∨  b^{51, 2}_0 ∨ false 
c  in DIMACS:
-16931  16932  16933  0

c  3 does not represent an automaton state.
c    -(-b^{51, 2}_2 ∧  b^{51, 2}_1 ∧  b^{51, 2}_0 ∧ true) 
c  in CNF:
c     b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ false 
c  in DIMACS:
 16931 -16932 -16933  0
c  -3 does not represent an automaton state.
c    -( b^{51, 2}_2 ∧  b^{51, 2}_1 ∧  b^{51, 2}_0 ∧ true) 
c  in CNF:
c    -b^{51, 2}_2 ∨ -b^{51, 2}_1 ∨ -b^{51, 2}_0 ∨ false 
c  in DIMACS:
-16931 -16932 -16933  0

c i = 3
c  -2+1 --> -1
c    ( b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧  p_153) -> ( b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0)
c  in CNF:
c    -b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨  b^{51, 4}_2
c    -b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_1
c    -b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨  b^{51, 4}_0
c  in DIMACS:
-16934 -16935  16936 -153  16937 0
-16934 -16935  16936 -153 -16938 0
-16934 -16935  16936 -153  16939 0

c  -1+1 --> 0
c    ( b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0 ∧  p_153) -> (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧ -b^{51, 4}_0)
c  in CNF:
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_2
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_1
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_0
c  in DIMACS:
-16934  16935 -16936 -153 -16937 0
-16934  16935 -16936 -153 -16938 0
-16934  16935 -16936 -153 -16939 0

c  0+1 --> 1
c    (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧  p_153) -> (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0)
c  in CNF:
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_2
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_1
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨  b^{51, 4}_0
c  in DIMACS:
 16934  16935  16936 -153 -16937 0
 16934  16935  16936 -153 -16938 0
 16934  16935  16936 -153  16939 0

c  1+1 --> 2
c    (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0 ∧  p_153) -> (-b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0)
c  in CNF:
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_2
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨  b^{51, 4}_1
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ -p_153 ∨ -b^{51, 4}_0
c  in DIMACS:
 16934  16935 -16936 -153 -16937 0
 16934  16935 -16936 -153  16938 0
 16934  16935 -16936 -153 -16939 0

c  2+1 --> break 
c    (-b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧  p_153) -> break
c  in CNF:
c     b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 16934 -16935  16936 -153 1162 0


c  2-1 --> 1
c    (-b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧ -p_153) -> (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0)
c  in CNF:
c     b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_2
c     b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_1
c     b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨  b^{51, 4}_0
c  in DIMACS:
 16934 -16935  16936  153 -16937 0
 16934 -16935  16936  153 -16938 0
 16934 -16935  16936  153  16939 0

c  1-1 --> 0
c    (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0 ∧ -p_153) -> (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧ -b^{51, 4}_0)
c  in CNF:
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_2
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_1
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_0
c  in DIMACS:
 16934  16935 -16936  153 -16937 0
 16934  16935 -16936  153 -16938 0
 16934  16935 -16936  153 -16939 0

c  0-1 --> -1
c    (-b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧ -p_153) -> ( b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0)
c  in CNF:
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨  b^{51, 4}_2
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_1
c     b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨  b^{51, 4}_0
c  in DIMACS:
 16934  16935  16936  153  16937 0
 16934  16935  16936  153 -16938 0
 16934  16935  16936  153  16939 0

c  -1-1 --> -2
c    ( b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧  b^{51, 3}_0 ∧ -p_153) -> ( b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0)
c  in CNF:
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨  b^{51, 4}_2
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨  b^{51, 4}_1
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨  p_153 ∨ -b^{51, 4}_0
c  in DIMACS:
-16934  16935 -16936  153  16937 0
-16934  16935 -16936  153  16938 0
-16934  16935 -16936  153 -16939 0

c  -2-1 --> break 
c    ( b^{51, 3}_2 ∧  b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨  b^{51, 3}_0 ∨  p_153 ∨ break
c  in DIMACS:
-16934 -16935  16936  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 3}_2 ∧ -b^{51, 3}_1 ∧ -b^{51, 3}_0 ∧ true) 
c  in CNF:
c    -b^{51, 3}_2 ∨  b^{51, 3}_1 ∨  b^{51, 3}_0 ∨ false 
c  in DIMACS:
-16934  16935  16936  0

c  3 does not represent an automaton state.
c    -(-b^{51, 3}_2 ∧  b^{51, 3}_1 ∧  b^{51, 3}_0 ∧ true) 
c  in CNF:
c     b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ false 
c  in DIMACS:
 16934 -16935 -16936  0
c  -3 does not represent an automaton state.
c    -( b^{51, 3}_2 ∧  b^{51, 3}_1 ∧  b^{51, 3}_0 ∧ true) 
c  in CNF:
c    -b^{51, 3}_2 ∨ -b^{51, 3}_1 ∨ -b^{51, 3}_0 ∨ false 
c  in DIMACS:
-16934 -16935 -16936  0

c i = 4
c  -2+1 --> -1
c    ( b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧  p_204) -> ( b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0)
c  in CNF:
c    -b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨  b^{51, 5}_2
c    -b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_1
c    -b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨  b^{51, 5}_0
c  in DIMACS:
-16937 -16938  16939 -204  16940 0
-16937 -16938  16939 -204 -16941 0
-16937 -16938  16939 -204  16942 0

c  -1+1 --> 0
c    ( b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0 ∧  p_204) -> (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧ -b^{51, 5}_0)
c  in CNF:
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_2
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_1
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_0
c  in DIMACS:
-16937  16938 -16939 -204 -16940 0
-16937  16938 -16939 -204 -16941 0
-16937  16938 -16939 -204 -16942 0

c  0+1 --> 1
c    (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧  p_204) -> (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0)
c  in CNF:
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_2
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_1
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨  b^{51, 5}_0
c  in DIMACS:
 16937  16938  16939 -204 -16940 0
 16937  16938  16939 -204 -16941 0
 16937  16938  16939 -204  16942 0

c  1+1 --> 2
c    (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0 ∧  p_204) -> (-b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0)
c  in CNF:
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_2
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨  b^{51, 5}_1
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ -p_204 ∨ -b^{51, 5}_0
c  in DIMACS:
 16937  16938 -16939 -204 -16940 0
 16937  16938 -16939 -204  16941 0
 16937  16938 -16939 -204 -16942 0

c  2+1 --> break 
c    (-b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧  p_204) -> break
c  in CNF:
c     b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 16937 -16938  16939 -204 1162 0


c  2-1 --> 1
c    (-b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧ -p_204) -> (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0)
c  in CNF:
c     b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_2
c     b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_1
c     b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨  b^{51, 5}_0
c  in DIMACS:
 16937 -16938  16939  204 -16940 0
 16937 -16938  16939  204 -16941 0
 16937 -16938  16939  204  16942 0

c  1-1 --> 0
c    (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0 ∧ -p_204) -> (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧ -b^{51, 5}_0)
c  in CNF:
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_2
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_1
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_0
c  in DIMACS:
 16937  16938 -16939  204 -16940 0
 16937  16938 -16939  204 -16941 0
 16937  16938 -16939  204 -16942 0

c  0-1 --> -1
c    (-b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧ -p_204) -> ( b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0)
c  in CNF:
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨  b^{51, 5}_2
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_1
c     b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨  b^{51, 5}_0
c  in DIMACS:
 16937  16938  16939  204  16940 0
 16937  16938  16939  204 -16941 0
 16937  16938  16939  204  16942 0

c  -1-1 --> -2
c    ( b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧  b^{51, 4}_0 ∧ -p_204) -> ( b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0)
c  in CNF:
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨  b^{51, 5}_2
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨  b^{51, 5}_1
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨  p_204 ∨ -b^{51, 5}_0
c  in DIMACS:
-16937  16938 -16939  204  16940 0
-16937  16938 -16939  204  16941 0
-16937  16938 -16939  204 -16942 0

c  -2-1 --> break 
c    ( b^{51, 4}_2 ∧  b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨  b^{51, 4}_0 ∨  p_204 ∨ break
c  in DIMACS:
-16937 -16938  16939  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 4}_2 ∧ -b^{51, 4}_1 ∧ -b^{51, 4}_0 ∧ true) 
c  in CNF:
c    -b^{51, 4}_2 ∨  b^{51, 4}_1 ∨  b^{51, 4}_0 ∨ false 
c  in DIMACS:
-16937  16938  16939  0

c  3 does not represent an automaton state.
c    -(-b^{51, 4}_2 ∧  b^{51, 4}_1 ∧  b^{51, 4}_0 ∧ true) 
c  in CNF:
c     b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ false 
c  in DIMACS:
 16937 -16938 -16939  0
c  -3 does not represent an automaton state.
c    -( b^{51, 4}_2 ∧  b^{51, 4}_1 ∧  b^{51, 4}_0 ∧ true) 
c  in CNF:
c    -b^{51, 4}_2 ∨ -b^{51, 4}_1 ∨ -b^{51, 4}_0 ∨ false 
c  in DIMACS:
-16937 -16938 -16939  0

c i = 5
c  -2+1 --> -1
c    ( b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧  p_255) -> ( b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0)
c  in CNF:
c    -b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨  b^{51, 6}_2
c    -b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_1
c    -b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨  b^{51, 6}_0
c  in DIMACS:
-16940 -16941  16942 -255  16943 0
-16940 -16941  16942 -255 -16944 0
-16940 -16941  16942 -255  16945 0

c  -1+1 --> 0
c    ( b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0 ∧  p_255) -> (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧ -b^{51, 6}_0)
c  in CNF:
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_2
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_1
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_0
c  in DIMACS:
-16940  16941 -16942 -255 -16943 0
-16940  16941 -16942 -255 -16944 0
-16940  16941 -16942 -255 -16945 0

c  0+1 --> 1
c    (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧  p_255) -> (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0)
c  in CNF:
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_2
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_1
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨  b^{51, 6}_0
c  in DIMACS:
 16940  16941  16942 -255 -16943 0
 16940  16941  16942 -255 -16944 0
 16940  16941  16942 -255  16945 0

c  1+1 --> 2
c    (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0 ∧  p_255) -> (-b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0)
c  in CNF:
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_2
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨  b^{51, 6}_1
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ -p_255 ∨ -b^{51, 6}_0
c  in DIMACS:
 16940  16941 -16942 -255 -16943 0
 16940  16941 -16942 -255  16944 0
 16940  16941 -16942 -255 -16945 0

c  2+1 --> break 
c    (-b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧  p_255) -> break
c  in CNF:
c     b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 16940 -16941  16942 -255 1162 0


c  2-1 --> 1
c    (-b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧ -p_255) -> (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0)
c  in CNF:
c     b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_2
c     b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_1
c     b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨  b^{51, 6}_0
c  in DIMACS:
 16940 -16941  16942  255 -16943 0
 16940 -16941  16942  255 -16944 0
 16940 -16941  16942  255  16945 0

c  1-1 --> 0
c    (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0 ∧ -p_255) -> (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧ -b^{51, 6}_0)
c  in CNF:
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_2
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_1
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_0
c  in DIMACS:
 16940  16941 -16942  255 -16943 0
 16940  16941 -16942  255 -16944 0
 16940  16941 -16942  255 -16945 0

c  0-1 --> -1
c    (-b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧ -p_255) -> ( b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0)
c  in CNF:
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨  b^{51, 6}_2
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_1
c     b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨  b^{51, 6}_0
c  in DIMACS:
 16940  16941  16942  255  16943 0
 16940  16941  16942  255 -16944 0
 16940  16941  16942  255  16945 0

c  -1-1 --> -2
c    ( b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧  b^{51, 5}_0 ∧ -p_255) -> ( b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0)
c  in CNF:
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨  b^{51, 6}_2
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨  b^{51, 6}_1
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨  p_255 ∨ -b^{51, 6}_0
c  in DIMACS:
-16940  16941 -16942  255  16943 0
-16940  16941 -16942  255  16944 0
-16940  16941 -16942  255 -16945 0

c  -2-1 --> break 
c    ( b^{51, 5}_2 ∧  b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨  b^{51, 5}_0 ∨  p_255 ∨ break
c  in DIMACS:
-16940 -16941  16942  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 5}_2 ∧ -b^{51, 5}_1 ∧ -b^{51, 5}_0 ∧ true) 
c  in CNF:
c    -b^{51, 5}_2 ∨  b^{51, 5}_1 ∨  b^{51, 5}_0 ∨ false 
c  in DIMACS:
-16940  16941  16942  0

c  3 does not represent an automaton state.
c    -(-b^{51, 5}_2 ∧  b^{51, 5}_1 ∧  b^{51, 5}_0 ∧ true) 
c  in CNF:
c     b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ false 
c  in DIMACS:
 16940 -16941 -16942  0
c  -3 does not represent an automaton state.
c    -( b^{51, 5}_2 ∧  b^{51, 5}_1 ∧  b^{51, 5}_0 ∧ true) 
c  in CNF:
c    -b^{51, 5}_2 ∨ -b^{51, 5}_1 ∨ -b^{51, 5}_0 ∨ false 
c  in DIMACS:
-16940 -16941 -16942  0

c i = 6
c  -2+1 --> -1
c    ( b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧  p_306) -> ( b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0)
c  in CNF:
c    -b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨  b^{51, 7}_2
c    -b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_1
c    -b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨  b^{51, 7}_0
c  in DIMACS:
-16943 -16944  16945 -306  16946 0
-16943 -16944  16945 -306 -16947 0
-16943 -16944  16945 -306  16948 0

c  -1+1 --> 0
c    ( b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0 ∧  p_306) -> (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧ -b^{51, 7}_0)
c  in CNF:
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_2
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_1
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_0
c  in DIMACS:
-16943  16944 -16945 -306 -16946 0
-16943  16944 -16945 -306 -16947 0
-16943  16944 -16945 -306 -16948 0

c  0+1 --> 1
c    (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧  p_306) -> (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0)
c  in CNF:
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_2
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_1
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨  b^{51, 7}_0
c  in DIMACS:
 16943  16944  16945 -306 -16946 0
 16943  16944  16945 -306 -16947 0
 16943  16944  16945 -306  16948 0

c  1+1 --> 2
c    (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0 ∧  p_306) -> (-b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0)
c  in CNF:
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_2
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨  b^{51, 7}_1
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ -p_306 ∨ -b^{51, 7}_0
c  in DIMACS:
 16943  16944 -16945 -306 -16946 0
 16943  16944 -16945 -306  16947 0
 16943  16944 -16945 -306 -16948 0

c  2+1 --> break 
c    (-b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧  p_306) -> break
c  in CNF:
c     b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 16943 -16944  16945 -306 1162 0


c  2-1 --> 1
c    (-b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧ -p_306) -> (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0)
c  in CNF:
c     b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_2
c     b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_1
c     b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨  b^{51, 7}_0
c  in DIMACS:
 16943 -16944  16945  306 -16946 0
 16943 -16944  16945  306 -16947 0
 16943 -16944  16945  306  16948 0

c  1-1 --> 0
c    (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0 ∧ -p_306) -> (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧ -b^{51, 7}_0)
c  in CNF:
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_2
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_1
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_0
c  in DIMACS:
 16943  16944 -16945  306 -16946 0
 16943  16944 -16945  306 -16947 0
 16943  16944 -16945  306 -16948 0

c  0-1 --> -1
c    (-b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧ -p_306) -> ( b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0)
c  in CNF:
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨  b^{51, 7}_2
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_1
c     b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨  b^{51, 7}_0
c  in DIMACS:
 16943  16944  16945  306  16946 0
 16943  16944  16945  306 -16947 0
 16943  16944  16945  306  16948 0

c  -1-1 --> -2
c    ( b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧  b^{51, 6}_0 ∧ -p_306) -> ( b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0)
c  in CNF:
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨  b^{51, 7}_2
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨  b^{51, 7}_1
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨  p_306 ∨ -b^{51, 7}_0
c  in DIMACS:
-16943  16944 -16945  306  16946 0
-16943  16944 -16945  306  16947 0
-16943  16944 -16945  306 -16948 0

c  -2-1 --> break 
c    ( b^{51, 6}_2 ∧  b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨  b^{51, 6}_0 ∨  p_306 ∨ break
c  in DIMACS:
-16943 -16944  16945  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 6}_2 ∧ -b^{51, 6}_1 ∧ -b^{51, 6}_0 ∧ true) 
c  in CNF:
c    -b^{51, 6}_2 ∨  b^{51, 6}_1 ∨  b^{51, 6}_0 ∨ false 
c  in DIMACS:
-16943  16944  16945  0

c  3 does not represent an automaton state.
c    -(-b^{51, 6}_2 ∧  b^{51, 6}_1 ∧  b^{51, 6}_0 ∧ true) 
c  in CNF:
c     b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ false 
c  in DIMACS:
 16943 -16944 -16945  0
c  -3 does not represent an automaton state.
c    -( b^{51, 6}_2 ∧  b^{51, 6}_1 ∧  b^{51, 6}_0 ∧ true) 
c  in CNF:
c    -b^{51, 6}_2 ∨ -b^{51, 6}_1 ∨ -b^{51, 6}_0 ∨ false 
c  in DIMACS:
-16943 -16944 -16945  0

c i = 7
c  -2+1 --> -1
c    ( b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧  p_357) -> ( b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0)
c  in CNF:
c    -b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨  b^{51, 8}_2
c    -b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_1
c    -b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨  b^{51, 8}_0
c  in DIMACS:
-16946 -16947  16948 -357  16949 0
-16946 -16947  16948 -357 -16950 0
-16946 -16947  16948 -357  16951 0

c  -1+1 --> 0
c    ( b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0 ∧  p_357) -> (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧ -b^{51, 8}_0)
c  in CNF:
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_2
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_1
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_0
c  in DIMACS:
-16946  16947 -16948 -357 -16949 0
-16946  16947 -16948 -357 -16950 0
-16946  16947 -16948 -357 -16951 0

c  0+1 --> 1
c    (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧  p_357) -> (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0)
c  in CNF:
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_2
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_1
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨  b^{51, 8}_0
c  in DIMACS:
 16946  16947  16948 -357 -16949 0
 16946  16947  16948 -357 -16950 0
 16946  16947  16948 -357  16951 0

c  1+1 --> 2
c    (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0 ∧  p_357) -> (-b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0)
c  in CNF:
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_2
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨  b^{51, 8}_1
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ -p_357 ∨ -b^{51, 8}_0
c  in DIMACS:
 16946  16947 -16948 -357 -16949 0
 16946  16947 -16948 -357  16950 0
 16946  16947 -16948 -357 -16951 0

c  2+1 --> break 
c    (-b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧  p_357) -> break
c  in CNF:
c     b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 16946 -16947  16948 -357 1162 0


c  2-1 --> 1
c    (-b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧ -p_357) -> (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0)
c  in CNF:
c     b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_2
c     b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_1
c     b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨  b^{51, 8}_0
c  in DIMACS:
 16946 -16947  16948  357 -16949 0
 16946 -16947  16948  357 -16950 0
 16946 -16947  16948  357  16951 0

c  1-1 --> 0
c    (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0 ∧ -p_357) -> (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧ -b^{51, 8}_0)
c  in CNF:
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_2
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_1
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_0
c  in DIMACS:
 16946  16947 -16948  357 -16949 0
 16946  16947 -16948  357 -16950 0
 16946  16947 -16948  357 -16951 0

c  0-1 --> -1
c    (-b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧ -p_357) -> ( b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0)
c  in CNF:
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨  b^{51, 8}_2
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_1
c     b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨  b^{51, 8}_0
c  in DIMACS:
 16946  16947  16948  357  16949 0
 16946  16947  16948  357 -16950 0
 16946  16947  16948  357  16951 0

c  -1-1 --> -2
c    ( b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧  b^{51, 7}_0 ∧ -p_357) -> ( b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0)
c  in CNF:
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨  b^{51, 8}_2
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨  b^{51, 8}_1
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨  p_357 ∨ -b^{51, 8}_0
c  in DIMACS:
-16946  16947 -16948  357  16949 0
-16946  16947 -16948  357  16950 0
-16946  16947 -16948  357 -16951 0

c  -2-1 --> break 
c    ( b^{51, 7}_2 ∧  b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨  b^{51, 7}_0 ∨  p_357 ∨ break
c  in DIMACS:
-16946 -16947  16948  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 7}_2 ∧ -b^{51, 7}_1 ∧ -b^{51, 7}_0 ∧ true) 
c  in CNF:
c    -b^{51, 7}_2 ∨  b^{51, 7}_1 ∨  b^{51, 7}_0 ∨ false 
c  in DIMACS:
-16946  16947  16948  0

c  3 does not represent an automaton state.
c    -(-b^{51, 7}_2 ∧  b^{51, 7}_1 ∧  b^{51, 7}_0 ∧ true) 
c  in CNF:
c     b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ false 
c  in DIMACS:
 16946 -16947 -16948  0
c  -3 does not represent an automaton state.
c    -( b^{51, 7}_2 ∧  b^{51, 7}_1 ∧  b^{51, 7}_0 ∧ true) 
c  in CNF:
c    -b^{51, 7}_2 ∨ -b^{51, 7}_1 ∨ -b^{51, 7}_0 ∨ false 
c  in DIMACS:
-16946 -16947 -16948  0

c i = 8
c  -2+1 --> -1
c    ( b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧  p_408) -> ( b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0)
c  in CNF:
c    -b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨  b^{51, 9}_2
c    -b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_1
c    -b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨  b^{51, 9}_0
c  in DIMACS:
-16949 -16950  16951 -408  16952 0
-16949 -16950  16951 -408 -16953 0
-16949 -16950  16951 -408  16954 0

c  -1+1 --> 0
c    ( b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0 ∧  p_408) -> (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧ -b^{51, 9}_0)
c  in CNF:
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_2
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_1
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_0
c  in DIMACS:
-16949  16950 -16951 -408 -16952 0
-16949  16950 -16951 -408 -16953 0
-16949  16950 -16951 -408 -16954 0

c  0+1 --> 1
c    (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧  p_408) -> (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0)
c  in CNF:
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_2
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_1
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨  b^{51, 9}_0
c  in DIMACS:
 16949  16950  16951 -408 -16952 0
 16949  16950  16951 -408 -16953 0
 16949  16950  16951 -408  16954 0

c  1+1 --> 2
c    (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0 ∧  p_408) -> (-b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0)
c  in CNF:
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_2
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨  b^{51, 9}_1
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ -p_408 ∨ -b^{51, 9}_0
c  in DIMACS:
 16949  16950 -16951 -408 -16952 0
 16949  16950 -16951 -408  16953 0
 16949  16950 -16951 -408 -16954 0

c  2+1 --> break 
c    (-b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧  p_408) -> break
c  in CNF:
c     b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 16949 -16950  16951 -408 1162 0


c  2-1 --> 1
c    (-b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧ -p_408) -> (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0)
c  in CNF:
c     b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_2
c     b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_1
c     b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨  b^{51, 9}_0
c  in DIMACS:
 16949 -16950  16951  408 -16952 0
 16949 -16950  16951  408 -16953 0
 16949 -16950  16951  408  16954 0

c  1-1 --> 0
c    (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0 ∧ -p_408) -> (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧ -b^{51, 9}_0)
c  in CNF:
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_2
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_1
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_0
c  in DIMACS:
 16949  16950 -16951  408 -16952 0
 16949  16950 -16951  408 -16953 0
 16949  16950 -16951  408 -16954 0

c  0-1 --> -1
c    (-b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧ -p_408) -> ( b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0)
c  in CNF:
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨  b^{51, 9}_2
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_1
c     b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨  b^{51, 9}_0
c  in DIMACS:
 16949  16950  16951  408  16952 0
 16949  16950  16951  408 -16953 0
 16949  16950  16951  408  16954 0

c  -1-1 --> -2
c    ( b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧  b^{51, 8}_0 ∧ -p_408) -> ( b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0)
c  in CNF:
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨  b^{51, 9}_2
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨  b^{51, 9}_1
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨  p_408 ∨ -b^{51, 9}_0
c  in DIMACS:
-16949  16950 -16951  408  16952 0
-16949  16950 -16951  408  16953 0
-16949  16950 -16951  408 -16954 0

c  -2-1 --> break 
c    ( b^{51, 8}_2 ∧  b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨  b^{51, 8}_0 ∨  p_408 ∨ break
c  in DIMACS:
-16949 -16950  16951  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 8}_2 ∧ -b^{51, 8}_1 ∧ -b^{51, 8}_0 ∧ true) 
c  in CNF:
c    -b^{51, 8}_2 ∨  b^{51, 8}_1 ∨  b^{51, 8}_0 ∨ false 
c  in DIMACS:
-16949  16950  16951  0

c  3 does not represent an automaton state.
c    -(-b^{51, 8}_2 ∧  b^{51, 8}_1 ∧  b^{51, 8}_0 ∧ true) 
c  in CNF:
c     b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ false 
c  in DIMACS:
 16949 -16950 -16951  0
c  -3 does not represent an automaton state.
c    -( b^{51, 8}_2 ∧  b^{51, 8}_1 ∧  b^{51, 8}_0 ∧ true) 
c  in CNF:
c    -b^{51, 8}_2 ∨ -b^{51, 8}_1 ∨ -b^{51, 8}_0 ∨ false 
c  in DIMACS:
-16949 -16950 -16951  0

c i = 9
c  -2+1 --> -1
c    ( b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧  p_459) -> ( b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0)
c  in CNF:
c    -b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨  b^{51, 10}_2
c    -b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_1
c    -b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨  b^{51, 10}_0
c  in DIMACS:
-16952 -16953  16954 -459  16955 0
-16952 -16953  16954 -459 -16956 0
-16952 -16953  16954 -459  16957 0

c  -1+1 --> 0
c    ( b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0 ∧  p_459) -> (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧ -b^{51, 10}_0)
c  in CNF:
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_2
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_1
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_0
c  in DIMACS:
-16952  16953 -16954 -459 -16955 0
-16952  16953 -16954 -459 -16956 0
-16952  16953 -16954 -459 -16957 0

c  0+1 --> 1
c    (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧  p_459) -> (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0)
c  in CNF:
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_2
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_1
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨  b^{51, 10}_0
c  in DIMACS:
 16952  16953  16954 -459 -16955 0
 16952  16953  16954 -459 -16956 0
 16952  16953  16954 -459  16957 0

c  1+1 --> 2
c    (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0 ∧  p_459) -> (-b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0)
c  in CNF:
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_2
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨  b^{51, 10}_1
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ -p_459 ∨ -b^{51, 10}_0
c  in DIMACS:
 16952  16953 -16954 -459 -16955 0
 16952  16953 -16954 -459  16956 0
 16952  16953 -16954 -459 -16957 0

c  2+1 --> break 
c    (-b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧  p_459) -> break
c  in CNF:
c     b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 16952 -16953  16954 -459 1162 0


c  2-1 --> 1
c    (-b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧ -p_459) -> (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0)
c  in CNF:
c     b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_2
c     b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_1
c     b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨  b^{51, 10}_0
c  in DIMACS:
 16952 -16953  16954  459 -16955 0
 16952 -16953  16954  459 -16956 0
 16952 -16953  16954  459  16957 0

c  1-1 --> 0
c    (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0 ∧ -p_459) -> (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧ -b^{51, 10}_0)
c  in CNF:
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_2
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_1
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_0
c  in DIMACS:
 16952  16953 -16954  459 -16955 0
 16952  16953 -16954  459 -16956 0
 16952  16953 -16954  459 -16957 0

c  0-1 --> -1
c    (-b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧ -p_459) -> ( b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0)
c  in CNF:
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨  b^{51, 10}_2
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_1
c     b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨  b^{51, 10}_0
c  in DIMACS:
 16952  16953  16954  459  16955 0
 16952  16953  16954  459 -16956 0
 16952  16953  16954  459  16957 0

c  -1-1 --> -2
c    ( b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧  b^{51, 9}_0 ∧ -p_459) -> ( b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0)
c  in CNF:
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨  b^{51, 10}_2
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨  b^{51, 10}_1
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨  p_459 ∨ -b^{51, 10}_0
c  in DIMACS:
-16952  16953 -16954  459  16955 0
-16952  16953 -16954  459  16956 0
-16952  16953 -16954  459 -16957 0

c  -2-1 --> break 
c    ( b^{51, 9}_2 ∧  b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨  b^{51, 9}_0 ∨  p_459 ∨ break
c  in DIMACS:
-16952 -16953  16954  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 9}_2 ∧ -b^{51, 9}_1 ∧ -b^{51, 9}_0 ∧ true) 
c  in CNF:
c    -b^{51, 9}_2 ∨  b^{51, 9}_1 ∨  b^{51, 9}_0 ∨ false 
c  in DIMACS:
-16952  16953  16954  0

c  3 does not represent an automaton state.
c    -(-b^{51, 9}_2 ∧  b^{51, 9}_1 ∧  b^{51, 9}_0 ∧ true) 
c  in CNF:
c     b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ false 
c  in DIMACS:
 16952 -16953 -16954  0
c  -3 does not represent an automaton state.
c    -( b^{51, 9}_2 ∧  b^{51, 9}_1 ∧  b^{51, 9}_0 ∧ true) 
c  in CNF:
c    -b^{51, 9}_2 ∨ -b^{51, 9}_1 ∨ -b^{51, 9}_0 ∨ false 
c  in DIMACS:
-16952 -16953 -16954  0

c i = 10
c  -2+1 --> -1
c    ( b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧  p_510) -> ( b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0)
c  in CNF:
c    -b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨  b^{51, 11}_2
c    -b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_1
c    -b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨  b^{51, 11}_0
c  in DIMACS:
-16955 -16956  16957 -510  16958 0
-16955 -16956  16957 -510 -16959 0
-16955 -16956  16957 -510  16960 0

c  -1+1 --> 0
c    ( b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0 ∧  p_510) -> (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧ -b^{51, 11}_0)
c  in CNF:
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_2
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_1
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_0
c  in DIMACS:
-16955  16956 -16957 -510 -16958 0
-16955  16956 -16957 -510 -16959 0
-16955  16956 -16957 -510 -16960 0

c  0+1 --> 1
c    (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧  p_510) -> (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0)
c  in CNF:
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_2
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_1
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨  b^{51, 11}_0
c  in DIMACS:
 16955  16956  16957 -510 -16958 0
 16955  16956  16957 -510 -16959 0
 16955  16956  16957 -510  16960 0

c  1+1 --> 2
c    (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0 ∧  p_510) -> (-b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0)
c  in CNF:
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_2
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨  b^{51, 11}_1
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ -p_510 ∨ -b^{51, 11}_0
c  in DIMACS:
 16955  16956 -16957 -510 -16958 0
 16955  16956 -16957 -510  16959 0
 16955  16956 -16957 -510 -16960 0

c  2+1 --> break 
c    (-b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧  p_510) -> break
c  in CNF:
c     b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 16955 -16956  16957 -510 1162 0


c  2-1 --> 1
c    (-b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧ -p_510) -> (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0)
c  in CNF:
c     b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_2
c     b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_1
c     b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨  b^{51, 11}_0
c  in DIMACS:
 16955 -16956  16957  510 -16958 0
 16955 -16956  16957  510 -16959 0
 16955 -16956  16957  510  16960 0

c  1-1 --> 0
c    (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0 ∧ -p_510) -> (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧ -b^{51, 11}_0)
c  in CNF:
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_2
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_1
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_0
c  in DIMACS:
 16955  16956 -16957  510 -16958 0
 16955  16956 -16957  510 -16959 0
 16955  16956 -16957  510 -16960 0

c  0-1 --> -1
c    (-b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧ -p_510) -> ( b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0)
c  in CNF:
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨  b^{51, 11}_2
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_1
c     b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨  b^{51, 11}_0
c  in DIMACS:
 16955  16956  16957  510  16958 0
 16955  16956  16957  510 -16959 0
 16955  16956  16957  510  16960 0

c  -1-1 --> -2
c    ( b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧  b^{51, 10}_0 ∧ -p_510) -> ( b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0)
c  in CNF:
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨  b^{51, 11}_2
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨  b^{51, 11}_1
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨  p_510 ∨ -b^{51, 11}_0
c  in DIMACS:
-16955  16956 -16957  510  16958 0
-16955  16956 -16957  510  16959 0
-16955  16956 -16957  510 -16960 0

c  -2-1 --> break 
c    ( b^{51, 10}_2 ∧  b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨  b^{51, 10}_0 ∨  p_510 ∨ break
c  in DIMACS:
-16955 -16956  16957  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 10}_2 ∧ -b^{51, 10}_1 ∧ -b^{51, 10}_0 ∧ true) 
c  in CNF:
c    -b^{51, 10}_2 ∨  b^{51, 10}_1 ∨  b^{51, 10}_0 ∨ false 
c  in DIMACS:
-16955  16956  16957  0

c  3 does not represent an automaton state.
c    -(-b^{51, 10}_2 ∧  b^{51, 10}_1 ∧  b^{51, 10}_0 ∧ true) 
c  in CNF:
c     b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ false 
c  in DIMACS:
 16955 -16956 -16957  0
c  -3 does not represent an automaton state.
c    -( b^{51, 10}_2 ∧  b^{51, 10}_1 ∧  b^{51, 10}_0 ∧ true) 
c  in CNF:
c    -b^{51, 10}_2 ∨ -b^{51, 10}_1 ∨ -b^{51, 10}_0 ∨ false 
c  in DIMACS:
-16955 -16956 -16957  0

c i = 11
c  -2+1 --> -1
c    ( b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧  p_561) -> ( b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0)
c  in CNF:
c    -b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨  b^{51, 12}_2
c    -b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_1
c    -b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨  b^{51, 12}_0
c  in DIMACS:
-16958 -16959  16960 -561  16961 0
-16958 -16959  16960 -561 -16962 0
-16958 -16959  16960 -561  16963 0

c  -1+1 --> 0
c    ( b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0 ∧  p_561) -> (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧ -b^{51, 12}_0)
c  in CNF:
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_2
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_1
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_0
c  in DIMACS:
-16958  16959 -16960 -561 -16961 0
-16958  16959 -16960 -561 -16962 0
-16958  16959 -16960 -561 -16963 0

c  0+1 --> 1
c    (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧  p_561) -> (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0)
c  in CNF:
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_2
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_1
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨  b^{51, 12}_0
c  in DIMACS:
 16958  16959  16960 -561 -16961 0
 16958  16959  16960 -561 -16962 0
 16958  16959  16960 -561  16963 0

c  1+1 --> 2
c    (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0 ∧  p_561) -> (-b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0)
c  in CNF:
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_2
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨  b^{51, 12}_1
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ -p_561 ∨ -b^{51, 12}_0
c  in DIMACS:
 16958  16959 -16960 -561 -16961 0
 16958  16959 -16960 -561  16962 0
 16958  16959 -16960 -561 -16963 0

c  2+1 --> break 
c    (-b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧  p_561) -> break
c  in CNF:
c     b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 16958 -16959  16960 -561 1162 0


c  2-1 --> 1
c    (-b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧ -p_561) -> (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0)
c  in CNF:
c     b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_2
c     b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_1
c     b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨  b^{51, 12}_0
c  in DIMACS:
 16958 -16959  16960  561 -16961 0
 16958 -16959  16960  561 -16962 0
 16958 -16959  16960  561  16963 0

c  1-1 --> 0
c    (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0 ∧ -p_561) -> (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧ -b^{51, 12}_0)
c  in CNF:
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_2
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_1
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_0
c  in DIMACS:
 16958  16959 -16960  561 -16961 0
 16958  16959 -16960  561 -16962 0
 16958  16959 -16960  561 -16963 0

c  0-1 --> -1
c    (-b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧ -p_561) -> ( b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0)
c  in CNF:
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨  b^{51, 12}_2
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_1
c     b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨  b^{51, 12}_0
c  in DIMACS:
 16958  16959  16960  561  16961 0
 16958  16959  16960  561 -16962 0
 16958  16959  16960  561  16963 0

c  -1-1 --> -2
c    ( b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧  b^{51, 11}_0 ∧ -p_561) -> ( b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0)
c  in CNF:
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨  b^{51, 12}_2
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨  b^{51, 12}_1
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨  p_561 ∨ -b^{51, 12}_0
c  in DIMACS:
-16958  16959 -16960  561  16961 0
-16958  16959 -16960  561  16962 0
-16958  16959 -16960  561 -16963 0

c  -2-1 --> break 
c    ( b^{51, 11}_2 ∧  b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨  b^{51, 11}_0 ∨  p_561 ∨ break
c  in DIMACS:
-16958 -16959  16960  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 11}_2 ∧ -b^{51, 11}_1 ∧ -b^{51, 11}_0 ∧ true) 
c  in CNF:
c    -b^{51, 11}_2 ∨  b^{51, 11}_1 ∨  b^{51, 11}_0 ∨ false 
c  in DIMACS:
-16958  16959  16960  0

c  3 does not represent an automaton state.
c    -(-b^{51, 11}_2 ∧  b^{51, 11}_1 ∧  b^{51, 11}_0 ∧ true) 
c  in CNF:
c     b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ false 
c  in DIMACS:
 16958 -16959 -16960  0
c  -3 does not represent an automaton state.
c    -( b^{51, 11}_2 ∧  b^{51, 11}_1 ∧  b^{51, 11}_0 ∧ true) 
c  in CNF:
c    -b^{51, 11}_2 ∨ -b^{51, 11}_1 ∨ -b^{51, 11}_0 ∨ false 
c  in DIMACS:
-16958 -16959 -16960  0

c i = 12
c  -2+1 --> -1
c    ( b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧  p_612) -> ( b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0)
c  in CNF:
c    -b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨  b^{51, 13}_2
c    -b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_1
c    -b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨  b^{51, 13}_0
c  in DIMACS:
-16961 -16962  16963 -612  16964 0
-16961 -16962  16963 -612 -16965 0
-16961 -16962  16963 -612  16966 0

c  -1+1 --> 0
c    ( b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0 ∧  p_612) -> (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧ -b^{51, 13}_0)
c  in CNF:
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_2
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_1
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_0
c  in DIMACS:
-16961  16962 -16963 -612 -16964 0
-16961  16962 -16963 -612 -16965 0
-16961  16962 -16963 -612 -16966 0

c  0+1 --> 1
c    (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧  p_612) -> (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0)
c  in CNF:
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_2
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_1
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨  b^{51, 13}_0
c  in DIMACS:
 16961  16962  16963 -612 -16964 0
 16961  16962  16963 -612 -16965 0
 16961  16962  16963 -612  16966 0

c  1+1 --> 2
c    (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0 ∧  p_612) -> (-b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0)
c  in CNF:
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_2
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨  b^{51, 13}_1
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ -p_612 ∨ -b^{51, 13}_0
c  in DIMACS:
 16961  16962 -16963 -612 -16964 0
 16961  16962 -16963 -612  16965 0
 16961  16962 -16963 -612 -16966 0

c  2+1 --> break 
c    (-b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧  p_612) -> break
c  in CNF:
c     b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 16961 -16962  16963 -612 1162 0


c  2-1 --> 1
c    (-b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧ -p_612) -> (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0)
c  in CNF:
c     b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_2
c     b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_1
c     b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨  b^{51, 13}_0
c  in DIMACS:
 16961 -16962  16963  612 -16964 0
 16961 -16962  16963  612 -16965 0
 16961 -16962  16963  612  16966 0

c  1-1 --> 0
c    (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0 ∧ -p_612) -> (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧ -b^{51, 13}_0)
c  in CNF:
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_2
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_1
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_0
c  in DIMACS:
 16961  16962 -16963  612 -16964 0
 16961  16962 -16963  612 -16965 0
 16961  16962 -16963  612 -16966 0

c  0-1 --> -1
c    (-b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧ -p_612) -> ( b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0)
c  in CNF:
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨  b^{51, 13}_2
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_1
c     b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨  b^{51, 13}_0
c  in DIMACS:
 16961  16962  16963  612  16964 0
 16961  16962  16963  612 -16965 0
 16961  16962  16963  612  16966 0

c  -1-1 --> -2
c    ( b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧  b^{51, 12}_0 ∧ -p_612) -> ( b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0)
c  in CNF:
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨  b^{51, 13}_2
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨  b^{51, 13}_1
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨  p_612 ∨ -b^{51, 13}_0
c  in DIMACS:
-16961  16962 -16963  612  16964 0
-16961  16962 -16963  612  16965 0
-16961  16962 -16963  612 -16966 0

c  -2-1 --> break 
c    ( b^{51, 12}_2 ∧  b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨  b^{51, 12}_0 ∨  p_612 ∨ break
c  in DIMACS:
-16961 -16962  16963  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 12}_2 ∧ -b^{51, 12}_1 ∧ -b^{51, 12}_0 ∧ true) 
c  in CNF:
c    -b^{51, 12}_2 ∨  b^{51, 12}_1 ∨  b^{51, 12}_0 ∨ false 
c  in DIMACS:
-16961  16962  16963  0

c  3 does not represent an automaton state.
c    -(-b^{51, 12}_2 ∧  b^{51, 12}_1 ∧  b^{51, 12}_0 ∧ true) 
c  in CNF:
c     b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ false 
c  in DIMACS:
 16961 -16962 -16963  0
c  -3 does not represent an automaton state.
c    -( b^{51, 12}_2 ∧  b^{51, 12}_1 ∧  b^{51, 12}_0 ∧ true) 
c  in CNF:
c    -b^{51, 12}_2 ∨ -b^{51, 12}_1 ∨ -b^{51, 12}_0 ∨ false 
c  in DIMACS:
-16961 -16962 -16963  0

c i = 13
c  -2+1 --> -1
c    ( b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧  p_663) -> ( b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0)
c  in CNF:
c    -b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨  b^{51, 14}_2
c    -b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_1
c    -b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨  b^{51, 14}_0
c  in DIMACS:
-16964 -16965  16966 -663  16967 0
-16964 -16965  16966 -663 -16968 0
-16964 -16965  16966 -663  16969 0

c  -1+1 --> 0
c    ( b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0 ∧  p_663) -> (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧ -b^{51, 14}_0)
c  in CNF:
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_2
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_1
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_0
c  in DIMACS:
-16964  16965 -16966 -663 -16967 0
-16964  16965 -16966 -663 -16968 0
-16964  16965 -16966 -663 -16969 0

c  0+1 --> 1
c    (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧  p_663) -> (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0)
c  in CNF:
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_2
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_1
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨  b^{51, 14}_0
c  in DIMACS:
 16964  16965  16966 -663 -16967 0
 16964  16965  16966 -663 -16968 0
 16964  16965  16966 -663  16969 0

c  1+1 --> 2
c    (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0 ∧  p_663) -> (-b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0)
c  in CNF:
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_2
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨  b^{51, 14}_1
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ -p_663 ∨ -b^{51, 14}_0
c  in DIMACS:
 16964  16965 -16966 -663 -16967 0
 16964  16965 -16966 -663  16968 0
 16964  16965 -16966 -663 -16969 0

c  2+1 --> break 
c    (-b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧  p_663) -> break
c  in CNF:
c     b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 16964 -16965  16966 -663 1162 0


c  2-1 --> 1
c    (-b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧ -p_663) -> (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0)
c  in CNF:
c     b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_2
c     b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_1
c     b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨  b^{51, 14}_0
c  in DIMACS:
 16964 -16965  16966  663 -16967 0
 16964 -16965  16966  663 -16968 0
 16964 -16965  16966  663  16969 0

c  1-1 --> 0
c    (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0 ∧ -p_663) -> (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧ -b^{51, 14}_0)
c  in CNF:
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_2
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_1
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_0
c  in DIMACS:
 16964  16965 -16966  663 -16967 0
 16964  16965 -16966  663 -16968 0
 16964  16965 -16966  663 -16969 0

c  0-1 --> -1
c    (-b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧ -p_663) -> ( b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0)
c  in CNF:
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨  b^{51, 14}_2
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_1
c     b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨  b^{51, 14}_0
c  in DIMACS:
 16964  16965  16966  663  16967 0
 16964  16965  16966  663 -16968 0
 16964  16965  16966  663  16969 0

c  -1-1 --> -2
c    ( b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧  b^{51, 13}_0 ∧ -p_663) -> ( b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0)
c  in CNF:
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨  b^{51, 14}_2
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨  b^{51, 14}_1
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨  p_663 ∨ -b^{51, 14}_0
c  in DIMACS:
-16964  16965 -16966  663  16967 0
-16964  16965 -16966  663  16968 0
-16964  16965 -16966  663 -16969 0

c  -2-1 --> break 
c    ( b^{51, 13}_2 ∧  b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨  b^{51, 13}_0 ∨  p_663 ∨ break
c  in DIMACS:
-16964 -16965  16966  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 13}_2 ∧ -b^{51, 13}_1 ∧ -b^{51, 13}_0 ∧ true) 
c  in CNF:
c    -b^{51, 13}_2 ∨  b^{51, 13}_1 ∨  b^{51, 13}_0 ∨ false 
c  in DIMACS:
-16964  16965  16966  0

c  3 does not represent an automaton state.
c    -(-b^{51, 13}_2 ∧  b^{51, 13}_1 ∧  b^{51, 13}_0 ∧ true) 
c  in CNF:
c     b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ false 
c  in DIMACS:
 16964 -16965 -16966  0
c  -3 does not represent an automaton state.
c    -( b^{51, 13}_2 ∧  b^{51, 13}_1 ∧  b^{51, 13}_0 ∧ true) 
c  in CNF:
c    -b^{51, 13}_2 ∨ -b^{51, 13}_1 ∨ -b^{51, 13}_0 ∨ false 
c  in DIMACS:
-16964 -16965 -16966  0

c i = 14
c  -2+1 --> -1
c    ( b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧  p_714) -> ( b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0)
c  in CNF:
c    -b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨  b^{51, 15}_2
c    -b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_1
c    -b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨  b^{51, 15}_0
c  in DIMACS:
-16967 -16968  16969 -714  16970 0
-16967 -16968  16969 -714 -16971 0
-16967 -16968  16969 -714  16972 0

c  -1+1 --> 0
c    ( b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0 ∧  p_714) -> (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧ -b^{51, 15}_0)
c  in CNF:
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_2
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_1
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_0
c  in DIMACS:
-16967  16968 -16969 -714 -16970 0
-16967  16968 -16969 -714 -16971 0
-16967  16968 -16969 -714 -16972 0

c  0+1 --> 1
c    (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧  p_714) -> (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0)
c  in CNF:
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_2
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_1
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨  b^{51, 15}_0
c  in DIMACS:
 16967  16968  16969 -714 -16970 0
 16967  16968  16969 -714 -16971 0
 16967  16968  16969 -714  16972 0

c  1+1 --> 2
c    (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0 ∧  p_714) -> (-b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0)
c  in CNF:
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_2
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨  b^{51, 15}_1
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ -p_714 ∨ -b^{51, 15}_0
c  in DIMACS:
 16967  16968 -16969 -714 -16970 0
 16967  16968 -16969 -714  16971 0
 16967  16968 -16969 -714 -16972 0

c  2+1 --> break 
c    (-b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧  p_714) -> break
c  in CNF:
c     b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 16967 -16968  16969 -714 1162 0


c  2-1 --> 1
c    (-b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧ -p_714) -> (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0)
c  in CNF:
c     b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_2
c     b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_1
c     b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨  b^{51, 15}_0
c  in DIMACS:
 16967 -16968  16969  714 -16970 0
 16967 -16968  16969  714 -16971 0
 16967 -16968  16969  714  16972 0

c  1-1 --> 0
c    (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0 ∧ -p_714) -> (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧ -b^{51, 15}_0)
c  in CNF:
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_2
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_1
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_0
c  in DIMACS:
 16967  16968 -16969  714 -16970 0
 16967  16968 -16969  714 -16971 0
 16967  16968 -16969  714 -16972 0

c  0-1 --> -1
c    (-b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧ -p_714) -> ( b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0)
c  in CNF:
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨  b^{51, 15}_2
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_1
c     b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨  b^{51, 15}_0
c  in DIMACS:
 16967  16968  16969  714  16970 0
 16967  16968  16969  714 -16971 0
 16967  16968  16969  714  16972 0

c  -1-1 --> -2
c    ( b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧  b^{51, 14}_0 ∧ -p_714) -> ( b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0)
c  in CNF:
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨  b^{51, 15}_2
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨  b^{51, 15}_1
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨  p_714 ∨ -b^{51, 15}_0
c  in DIMACS:
-16967  16968 -16969  714  16970 0
-16967  16968 -16969  714  16971 0
-16967  16968 -16969  714 -16972 0

c  -2-1 --> break 
c    ( b^{51, 14}_2 ∧  b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨  b^{51, 14}_0 ∨  p_714 ∨ break
c  in DIMACS:
-16967 -16968  16969  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 14}_2 ∧ -b^{51, 14}_1 ∧ -b^{51, 14}_0 ∧ true) 
c  in CNF:
c    -b^{51, 14}_2 ∨  b^{51, 14}_1 ∨  b^{51, 14}_0 ∨ false 
c  in DIMACS:
-16967  16968  16969  0

c  3 does not represent an automaton state.
c    -(-b^{51, 14}_2 ∧  b^{51, 14}_1 ∧  b^{51, 14}_0 ∧ true) 
c  in CNF:
c     b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ false 
c  in DIMACS:
 16967 -16968 -16969  0
c  -3 does not represent an automaton state.
c    -( b^{51, 14}_2 ∧  b^{51, 14}_1 ∧  b^{51, 14}_0 ∧ true) 
c  in CNF:
c    -b^{51, 14}_2 ∨ -b^{51, 14}_1 ∨ -b^{51, 14}_0 ∨ false 
c  in DIMACS:
-16967 -16968 -16969  0

c i = 15
c  -2+1 --> -1
c    ( b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧  p_765) -> ( b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0)
c  in CNF:
c    -b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨  b^{51, 16}_2
c    -b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_1
c    -b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨  b^{51, 16}_0
c  in DIMACS:
-16970 -16971  16972 -765  16973 0
-16970 -16971  16972 -765 -16974 0
-16970 -16971  16972 -765  16975 0

c  -1+1 --> 0
c    ( b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0 ∧  p_765) -> (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧ -b^{51, 16}_0)
c  in CNF:
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_2
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_1
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_0
c  in DIMACS:
-16970  16971 -16972 -765 -16973 0
-16970  16971 -16972 -765 -16974 0
-16970  16971 -16972 -765 -16975 0

c  0+1 --> 1
c    (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧  p_765) -> (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0)
c  in CNF:
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_2
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_1
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨  b^{51, 16}_0
c  in DIMACS:
 16970  16971  16972 -765 -16973 0
 16970  16971  16972 -765 -16974 0
 16970  16971  16972 -765  16975 0

c  1+1 --> 2
c    (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0 ∧  p_765) -> (-b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0)
c  in CNF:
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_2
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨  b^{51, 16}_1
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ -p_765 ∨ -b^{51, 16}_0
c  in DIMACS:
 16970  16971 -16972 -765 -16973 0
 16970  16971 -16972 -765  16974 0
 16970  16971 -16972 -765 -16975 0

c  2+1 --> break 
c    (-b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧  p_765) -> break
c  in CNF:
c     b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 16970 -16971  16972 -765 1162 0


c  2-1 --> 1
c    (-b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧ -p_765) -> (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0)
c  in CNF:
c     b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_2
c     b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_1
c     b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨  b^{51, 16}_0
c  in DIMACS:
 16970 -16971  16972  765 -16973 0
 16970 -16971  16972  765 -16974 0
 16970 -16971  16972  765  16975 0

c  1-1 --> 0
c    (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0 ∧ -p_765) -> (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧ -b^{51, 16}_0)
c  in CNF:
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_2
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_1
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_0
c  in DIMACS:
 16970  16971 -16972  765 -16973 0
 16970  16971 -16972  765 -16974 0
 16970  16971 -16972  765 -16975 0

c  0-1 --> -1
c    (-b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧ -p_765) -> ( b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0)
c  in CNF:
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨  b^{51, 16}_2
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_1
c     b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨  b^{51, 16}_0
c  in DIMACS:
 16970  16971  16972  765  16973 0
 16970  16971  16972  765 -16974 0
 16970  16971  16972  765  16975 0

c  -1-1 --> -2
c    ( b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧  b^{51, 15}_0 ∧ -p_765) -> ( b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0)
c  in CNF:
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨  b^{51, 16}_2
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨  b^{51, 16}_1
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨  p_765 ∨ -b^{51, 16}_0
c  in DIMACS:
-16970  16971 -16972  765  16973 0
-16970  16971 -16972  765  16974 0
-16970  16971 -16972  765 -16975 0

c  -2-1 --> break 
c    ( b^{51, 15}_2 ∧  b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨  b^{51, 15}_0 ∨  p_765 ∨ break
c  in DIMACS:
-16970 -16971  16972  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 15}_2 ∧ -b^{51, 15}_1 ∧ -b^{51, 15}_0 ∧ true) 
c  in CNF:
c    -b^{51, 15}_2 ∨  b^{51, 15}_1 ∨  b^{51, 15}_0 ∨ false 
c  in DIMACS:
-16970  16971  16972  0

c  3 does not represent an automaton state.
c    -(-b^{51, 15}_2 ∧  b^{51, 15}_1 ∧  b^{51, 15}_0 ∧ true) 
c  in CNF:
c     b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ false 
c  in DIMACS:
 16970 -16971 -16972  0
c  -3 does not represent an automaton state.
c    -( b^{51, 15}_2 ∧  b^{51, 15}_1 ∧  b^{51, 15}_0 ∧ true) 
c  in CNF:
c    -b^{51, 15}_2 ∨ -b^{51, 15}_1 ∨ -b^{51, 15}_0 ∨ false 
c  in DIMACS:
-16970 -16971 -16972  0

c i = 16
c  -2+1 --> -1
c    ( b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧  p_816) -> ( b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0)
c  in CNF:
c    -b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨  b^{51, 17}_2
c    -b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_1
c    -b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨  b^{51, 17}_0
c  in DIMACS:
-16973 -16974  16975 -816  16976 0
-16973 -16974  16975 -816 -16977 0
-16973 -16974  16975 -816  16978 0

c  -1+1 --> 0
c    ( b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0 ∧  p_816) -> (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧ -b^{51, 17}_0)
c  in CNF:
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_2
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_1
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_0
c  in DIMACS:
-16973  16974 -16975 -816 -16976 0
-16973  16974 -16975 -816 -16977 0
-16973  16974 -16975 -816 -16978 0

c  0+1 --> 1
c    (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧  p_816) -> (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0)
c  in CNF:
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_2
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_1
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨  b^{51, 17}_0
c  in DIMACS:
 16973  16974  16975 -816 -16976 0
 16973  16974  16975 -816 -16977 0
 16973  16974  16975 -816  16978 0

c  1+1 --> 2
c    (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0 ∧  p_816) -> (-b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0)
c  in CNF:
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_2
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨  b^{51, 17}_1
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ -p_816 ∨ -b^{51, 17}_0
c  in DIMACS:
 16973  16974 -16975 -816 -16976 0
 16973  16974 -16975 -816  16977 0
 16973  16974 -16975 -816 -16978 0

c  2+1 --> break 
c    (-b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧  p_816) -> break
c  in CNF:
c     b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 16973 -16974  16975 -816 1162 0


c  2-1 --> 1
c    (-b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧ -p_816) -> (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0)
c  in CNF:
c     b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_2
c     b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_1
c     b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨  b^{51, 17}_0
c  in DIMACS:
 16973 -16974  16975  816 -16976 0
 16973 -16974  16975  816 -16977 0
 16973 -16974  16975  816  16978 0

c  1-1 --> 0
c    (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0 ∧ -p_816) -> (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧ -b^{51, 17}_0)
c  in CNF:
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_2
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_1
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_0
c  in DIMACS:
 16973  16974 -16975  816 -16976 0
 16973  16974 -16975  816 -16977 0
 16973  16974 -16975  816 -16978 0

c  0-1 --> -1
c    (-b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧ -p_816) -> ( b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0)
c  in CNF:
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨  b^{51, 17}_2
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_1
c     b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨  b^{51, 17}_0
c  in DIMACS:
 16973  16974  16975  816  16976 0
 16973  16974  16975  816 -16977 0
 16973  16974  16975  816  16978 0

c  -1-1 --> -2
c    ( b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧  b^{51, 16}_0 ∧ -p_816) -> ( b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0)
c  in CNF:
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨  b^{51, 17}_2
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨  b^{51, 17}_1
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨  p_816 ∨ -b^{51, 17}_0
c  in DIMACS:
-16973  16974 -16975  816  16976 0
-16973  16974 -16975  816  16977 0
-16973  16974 -16975  816 -16978 0

c  -2-1 --> break 
c    ( b^{51, 16}_2 ∧  b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨  b^{51, 16}_0 ∨  p_816 ∨ break
c  in DIMACS:
-16973 -16974  16975  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 16}_2 ∧ -b^{51, 16}_1 ∧ -b^{51, 16}_0 ∧ true) 
c  in CNF:
c    -b^{51, 16}_2 ∨  b^{51, 16}_1 ∨  b^{51, 16}_0 ∨ false 
c  in DIMACS:
-16973  16974  16975  0

c  3 does not represent an automaton state.
c    -(-b^{51, 16}_2 ∧  b^{51, 16}_1 ∧  b^{51, 16}_0 ∧ true) 
c  in CNF:
c     b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ false 
c  in DIMACS:
 16973 -16974 -16975  0
c  -3 does not represent an automaton state.
c    -( b^{51, 16}_2 ∧  b^{51, 16}_1 ∧  b^{51, 16}_0 ∧ true) 
c  in CNF:
c    -b^{51, 16}_2 ∨ -b^{51, 16}_1 ∨ -b^{51, 16}_0 ∨ false 
c  in DIMACS:
-16973 -16974 -16975  0

c i = 17
c  -2+1 --> -1
c    ( b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧  p_867) -> ( b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0)
c  in CNF:
c    -b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨  b^{51, 18}_2
c    -b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_1
c    -b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨  b^{51, 18}_0
c  in DIMACS:
-16976 -16977  16978 -867  16979 0
-16976 -16977  16978 -867 -16980 0
-16976 -16977  16978 -867  16981 0

c  -1+1 --> 0
c    ( b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0 ∧  p_867) -> (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧ -b^{51, 18}_0)
c  in CNF:
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_2
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_1
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_0
c  in DIMACS:
-16976  16977 -16978 -867 -16979 0
-16976  16977 -16978 -867 -16980 0
-16976  16977 -16978 -867 -16981 0

c  0+1 --> 1
c    (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧  p_867) -> (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0)
c  in CNF:
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_2
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_1
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨  b^{51, 18}_0
c  in DIMACS:
 16976  16977  16978 -867 -16979 0
 16976  16977  16978 -867 -16980 0
 16976  16977  16978 -867  16981 0

c  1+1 --> 2
c    (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0 ∧  p_867) -> (-b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0)
c  in CNF:
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_2
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨  b^{51, 18}_1
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ -p_867 ∨ -b^{51, 18}_0
c  in DIMACS:
 16976  16977 -16978 -867 -16979 0
 16976  16977 -16978 -867  16980 0
 16976  16977 -16978 -867 -16981 0

c  2+1 --> break 
c    (-b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧  p_867) -> break
c  in CNF:
c     b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ -p_867 ∨ break
c  in DIMACS:
 16976 -16977  16978 -867 1162 0


c  2-1 --> 1
c    (-b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧ -p_867) -> (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0)
c  in CNF:
c     b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_2
c     b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_1
c     b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨  b^{51, 18}_0
c  in DIMACS:
 16976 -16977  16978  867 -16979 0
 16976 -16977  16978  867 -16980 0
 16976 -16977  16978  867  16981 0

c  1-1 --> 0
c    (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0 ∧ -p_867) -> (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧ -b^{51, 18}_0)
c  in CNF:
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_2
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_1
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_0
c  in DIMACS:
 16976  16977 -16978  867 -16979 0
 16976  16977 -16978  867 -16980 0
 16976  16977 -16978  867 -16981 0

c  0-1 --> -1
c    (-b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧ -p_867) -> ( b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0)
c  in CNF:
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨  b^{51, 18}_2
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_1
c     b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨  b^{51, 18}_0
c  in DIMACS:
 16976  16977  16978  867  16979 0
 16976  16977  16978  867 -16980 0
 16976  16977  16978  867  16981 0

c  -1-1 --> -2
c    ( b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧  b^{51, 17}_0 ∧ -p_867) -> ( b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0)
c  in CNF:
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨  b^{51, 18}_2
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨  b^{51, 18}_1
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨  p_867 ∨ -b^{51, 18}_0
c  in DIMACS:
-16976  16977 -16978  867  16979 0
-16976  16977 -16978  867  16980 0
-16976  16977 -16978  867 -16981 0

c  -2-1 --> break 
c    ( b^{51, 17}_2 ∧  b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧ -p_867) -> break
c  in CNF:
c    -b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨  b^{51, 17}_0 ∨  p_867 ∨ break
c  in DIMACS:
-16976 -16977  16978  867 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 17}_2 ∧ -b^{51, 17}_1 ∧ -b^{51, 17}_0 ∧ true) 
c  in CNF:
c    -b^{51, 17}_2 ∨  b^{51, 17}_1 ∨  b^{51, 17}_0 ∨ false 
c  in DIMACS:
-16976  16977  16978  0

c  3 does not represent an automaton state.
c    -(-b^{51, 17}_2 ∧  b^{51, 17}_1 ∧  b^{51, 17}_0 ∧ true) 
c  in CNF:
c     b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ false 
c  in DIMACS:
 16976 -16977 -16978  0
c  -3 does not represent an automaton state.
c    -( b^{51, 17}_2 ∧  b^{51, 17}_1 ∧  b^{51, 17}_0 ∧ true) 
c  in CNF:
c    -b^{51, 17}_2 ∨ -b^{51, 17}_1 ∨ -b^{51, 17}_0 ∨ false 
c  in DIMACS:
-16976 -16977 -16978  0

c i = 18
c  -2+1 --> -1
c    ( b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧  p_918) -> ( b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0)
c  in CNF:
c    -b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨  b^{51, 19}_2
c    -b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_1
c    -b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨  b^{51, 19}_0
c  in DIMACS:
-16979 -16980  16981 -918  16982 0
-16979 -16980  16981 -918 -16983 0
-16979 -16980  16981 -918  16984 0

c  -1+1 --> 0
c    ( b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0 ∧  p_918) -> (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧ -b^{51, 19}_0)
c  in CNF:
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_2
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_1
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_0
c  in DIMACS:
-16979  16980 -16981 -918 -16982 0
-16979  16980 -16981 -918 -16983 0
-16979  16980 -16981 -918 -16984 0

c  0+1 --> 1
c    (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧  p_918) -> (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0)
c  in CNF:
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_2
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_1
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨  b^{51, 19}_0
c  in DIMACS:
 16979  16980  16981 -918 -16982 0
 16979  16980  16981 -918 -16983 0
 16979  16980  16981 -918  16984 0

c  1+1 --> 2
c    (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0 ∧  p_918) -> (-b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0)
c  in CNF:
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_2
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨  b^{51, 19}_1
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ -p_918 ∨ -b^{51, 19}_0
c  in DIMACS:
 16979  16980 -16981 -918 -16982 0
 16979  16980 -16981 -918  16983 0
 16979  16980 -16981 -918 -16984 0

c  2+1 --> break 
c    (-b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧  p_918) -> break
c  in CNF:
c     b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 16979 -16980  16981 -918 1162 0


c  2-1 --> 1
c    (-b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧ -p_918) -> (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0)
c  in CNF:
c     b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_2
c     b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_1
c     b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨  b^{51, 19}_0
c  in DIMACS:
 16979 -16980  16981  918 -16982 0
 16979 -16980  16981  918 -16983 0
 16979 -16980  16981  918  16984 0

c  1-1 --> 0
c    (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0 ∧ -p_918) -> (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧ -b^{51, 19}_0)
c  in CNF:
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_2
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_1
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_0
c  in DIMACS:
 16979  16980 -16981  918 -16982 0
 16979  16980 -16981  918 -16983 0
 16979  16980 -16981  918 -16984 0

c  0-1 --> -1
c    (-b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧ -p_918) -> ( b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0)
c  in CNF:
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨  b^{51, 19}_2
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_1
c     b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨  b^{51, 19}_0
c  in DIMACS:
 16979  16980  16981  918  16982 0
 16979  16980  16981  918 -16983 0
 16979  16980  16981  918  16984 0

c  -1-1 --> -2
c    ( b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧  b^{51, 18}_0 ∧ -p_918) -> ( b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0)
c  in CNF:
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨  b^{51, 19}_2
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨  b^{51, 19}_1
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨  p_918 ∨ -b^{51, 19}_0
c  in DIMACS:
-16979  16980 -16981  918  16982 0
-16979  16980 -16981  918  16983 0
-16979  16980 -16981  918 -16984 0

c  -2-1 --> break 
c    ( b^{51, 18}_2 ∧  b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨  b^{51, 18}_0 ∨  p_918 ∨ break
c  in DIMACS:
-16979 -16980  16981  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 18}_2 ∧ -b^{51, 18}_1 ∧ -b^{51, 18}_0 ∧ true) 
c  in CNF:
c    -b^{51, 18}_2 ∨  b^{51, 18}_1 ∨  b^{51, 18}_0 ∨ false 
c  in DIMACS:
-16979  16980  16981  0

c  3 does not represent an automaton state.
c    -(-b^{51, 18}_2 ∧  b^{51, 18}_1 ∧  b^{51, 18}_0 ∧ true) 
c  in CNF:
c     b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ false 
c  in DIMACS:
 16979 -16980 -16981  0
c  -3 does not represent an automaton state.
c    -( b^{51, 18}_2 ∧  b^{51, 18}_1 ∧  b^{51, 18}_0 ∧ true) 
c  in CNF:
c    -b^{51, 18}_2 ∨ -b^{51, 18}_1 ∨ -b^{51, 18}_0 ∨ false 
c  in DIMACS:
-16979 -16980 -16981  0

c i = 19
c  -2+1 --> -1
c    ( b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧  p_969) -> ( b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0)
c  in CNF:
c    -b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨  b^{51, 20}_2
c    -b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_1
c    -b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨  b^{51, 20}_0
c  in DIMACS:
-16982 -16983  16984 -969  16985 0
-16982 -16983  16984 -969 -16986 0
-16982 -16983  16984 -969  16987 0

c  -1+1 --> 0
c    ( b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0 ∧  p_969) -> (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧ -b^{51, 20}_0)
c  in CNF:
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_2
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_1
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_0
c  in DIMACS:
-16982  16983 -16984 -969 -16985 0
-16982  16983 -16984 -969 -16986 0
-16982  16983 -16984 -969 -16987 0

c  0+1 --> 1
c    (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧  p_969) -> (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0)
c  in CNF:
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_2
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_1
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨  b^{51, 20}_0
c  in DIMACS:
 16982  16983  16984 -969 -16985 0
 16982  16983  16984 -969 -16986 0
 16982  16983  16984 -969  16987 0

c  1+1 --> 2
c    (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0 ∧  p_969) -> (-b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0)
c  in CNF:
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_2
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨  b^{51, 20}_1
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ -p_969 ∨ -b^{51, 20}_0
c  in DIMACS:
 16982  16983 -16984 -969 -16985 0
 16982  16983 -16984 -969  16986 0
 16982  16983 -16984 -969 -16987 0

c  2+1 --> break 
c    (-b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧  p_969) -> break
c  in CNF:
c     b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 16982 -16983  16984 -969 1162 0


c  2-1 --> 1
c    (-b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧ -p_969) -> (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0)
c  in CNF:
c     b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_2
c     b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_1
c     b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨  b^{51, 20}_0
c  in DIMACS:
 16982 -16983  16984  969 -16985 0
 16982 -16983  16984  969 -16986 0
 16982 -16983  16984  969  16987 0

c  1-1 --> 0
c    (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0 ∧ -p_969) -> (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧ -b^{51, 20}_0)
c  in CNF:
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_2
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_1
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_0
c  in DIMACS:
 16982  16983 -16984  969 -16985 0
 16982  16983 -16984  969 -16986 0
 16982  16983 -16984  969 -16987 0

c  0-1 --> -1
c    (-b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧ -p_969) -> ( b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0)
c  in CNF:
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨  b^{51, 20}_2
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_1
c     b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨  b^{51, 20}_0
c  in DIMACS:
 16982  16983  16984  969  16985 0
 16982  16983  16984  969 -16986 0
 16982  16983  16984  969  16987 0

c  -1-1 --> -2
c    ( b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧  b^{51, 19}_0 ∧ -p_969) -> ( b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0)
c  in CNF:
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨  b^{51, 20}_2
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨  b^{51, 20}_1
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨  p_969 ∨ -b^{51, 20}_0
c  in DIMACS:
-16982  16983 -16984  969  16985 0
-16982  16983 -16984  969  16986 0
-16982  16983 -16984  969 -16987 0

c  -2-1 --> break 
c    ( b^{51, 19}_2 ∧  b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨  b^{51, 19}_0 ∨  p_969 ∨ break
c  in DIMACS:
-16982 -16983  16984  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 19}_2 ∧ -b^{51, 19}_1 ∧ -b^{51, 19}_0 ∧ true) 
c  in CNF:
c    -b^{51, 19}_2 ∨  b^{51, 19}_1 ∨  b^{51, 19}_0 ∨ false 
c  in DIMACS:
-16982  16983  16984  0

c  3 does not represent an automaton state.
c    -(-b^{51, 19}_2 ∧  b^{51, 19}_1 ∧  b^{51, 19}_0 ∧ true) 
c  in CNF:
c     b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ false 
c  in DIMACS:
 16982 -16983 -16984  0
c  -3 does not represent an automaton state.
c    -( b^{51, 19}_2 ∧  b^{51, 19}_1 ∧  b^{51, 19}_0 ∧ true) 
c  in CNF:
c    -b^{51, 19}_2 ∨ -b^{51, 19}_1 ∨ -b^{51, 19}_0 ∨ false 
c  in DIMACS:
-16982 -16983 -16984  0

c i = 20
c  -2+1 --> -1
c    ( b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧  p_1020) -> ( b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0)
c  in CNF:
c    -b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨  b^{51, 21}_2
c    -b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_1
c    -b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨  b^{51, 21}_0
c  in DIMACS:
-16985 -16986  16987 -1020  16988 0
-16985 -16986  16987 -1020 -16989 0
-16985 -16986  16987 -1020  16990 0

c  -1+1 --> 0
c    ( b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0 ∧  p_1020) -> (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧ -b^{51, 21}_0)
c  in CNF:
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_2
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_1
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_0
c  in DIMACS:
-16985  16986 -16987 -1020 -16988 0
-16985  16986 -16987 -1020 -16989 0
-16985  16986 -16987 -1020 -16990 0

c  0+1 --> 1
c    (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧  p_1020) -> (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0)
c  in CNF:
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_2
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_1
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨  b^{51, 21}_0
c  in DIMACS:
 16985  16986  16987 -1020 -16988 0
 16985  16986  16987 -1020 -16989 0
 16985  16986  16987 -1020  16990 0

c  1+1 --> 2
c    (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0 ∧  p_1020) -> (-b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0)
c  in CNF:
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_2
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨  b^{51, 21}_1
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ -p_1020 ∨ -b^{51, 21}_0
c  in DIMACS:
 16985  16986 -16987 -1020 -16988 0
 16985  16986 -16987 -1020  16989 0
 16985  16986 -16987 -1020 -16990 0

c  2+1 --> break 
c    (-b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 16985 -16986  16987 -1020 1162 0


c  2-1 --> 1
c    (-b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧ -p_1020) -> (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0)
c  in CNF:
c     b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_2
c     b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_1
c     b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨  b^{51, 21}_0
c  in DIMACS:
 16985 -16986  16987  1020 -16988 0
 16985 -16986  16987  1020 -16989 0
 16985 -16986  16987  1020  16990 0

c  1-1 --> 0
c    (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0 ∧ -p_1020) -> (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧ -b^{51, 21}_0)
c  in CNF:
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_2
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_1
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_0
c  in DIMACS:
 16985  16986 -16987  1020 -16988 0
 16985  16986 -16987  1020 -16989 0
 16985  16986 -16987  1020 -16990 0

c  0-1 --> -1
c    (-b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧ -p_1020) -> ( b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0)
c  in CNF:
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨  b^{51, 21}_2
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_1
c     b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨  b^{51, 21}_0
c  in DIMACS:
 16985  16986  16987  1020  16988 0
 16985  16986  16987  1020 -16989 0
 16985  16986  16987  1020  16990 0

c  -1-1 --> -2
c    ( b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧  b^{51, 20}_0 ∧ -p_1020) -> ( b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0)
c  in CNF:
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨  b^{51, 21}_2
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨  b^{51, 21}_1
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨  p_1020 ∨ -b^{51, 21}_0
c  in DIMACS:
-16985  16986 -16987  1020  16988 0
-16985  16986 -16987  1020  16989 0
-16985  16986 -16987  1020 -16990 0

c  -2-1 --> break 
c    ( b^{51, 20}_2 ∧  b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨  b^{51, 20}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-16985 -16986  16987  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 20}_2 ∧ -b^{51, 20}_1 ∧ -b^{51, 20}_0 ∧ true) 
c  in CNF:
c    -b^{51, 20}_2 ∨  b^{51, 20}_1 ∨  b^{51, 20}_0 ∨ false 
c  in DIMACS:
-16985  16986  16987  0

c  3 does not represent an automaton state.
c    -(-b^{51, 20}_2 ∧  b^{51, 20}_1 ∧  b^{51, 20}_0 ∧ true) 
c  in CNF:
c     b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ false 
c  in DIMACS:
 16985 -16986 -16987  0
c  -3 does not represent an automaton state.
c    -( b^{51, 20}_2 ∧  b^{51, 20}_1 ∧  b^{51, 20}_0 ∧ true) 
c  in CNF:
c    -b^{51, 20}_2 ∨ -b^{51, 20}_1 ∨ -b^{51, 20}_0 ∨ false 
c  in DIMACS:
-16985 -16986 -16987  0

c i = 21
c  -2+1 --> -1
c    ( b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧  p_1071) -> ( b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0)
c  in CNF:
c    -b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨  b^{51, 22}_2
c    -b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_1
c    -b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨  b^{51, 22}_0
c  in DIMACS:
-16988 -16989  16990 -1071  16991 0
-16988 -16989  16990 -1071 -16992 0
-16988 -16989  16990 -1071  16993 0

c  -1+1 --> 0
c    ( b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0 ∧  p_1071) -> (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧ -b^{51, 22}_0)
c  in CNF:
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_2
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_1
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_0
c  in DIMACS:
-16988  16989 -16990 -1071 -16991 0
-16988  16989 -16990 -1071 -16992 0
-16988  16989 -16990 -1071 -16993 0

c  0+1 --> 1
c    (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧  p_1071) -> (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0)
c  in CNF:
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_2
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_1
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨  b^{51, 22}_0
c  in DIMACS:
 16988  16989  16990 -1071 -16991 0
 16988  16989  16990 -1071 -16992 0
 16988  16989  16990 -1071  16993 0

c  1+1 --> 2
c    (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0 ∧  p_1071) -> (-b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0)
c  in CNF:
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_2
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨  b^{51, 22}_1
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ -p_1071 ∨ -b^{51, 22}_0
c  in DIMACS:
 16988  16989 -16990 -1071 -16991 0
 16988  16989 -16990 -1071  16992 0
 16988  16989 -16990 -1071 -16993 0

c  2+1 --> break 
c    (-b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 16988 -16989  16990 -1071 1162 0


c  2-1 --> 1
c    (-b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧ -p_1071) -> (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0)
c  in CNF:
c     b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_2
c     b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_1
c     b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨  b^{51, 22}_0
c  in DIMACS:
 16988 -16989  16990  1071 -16991 0
 16988 -16989  16990  1071 -16992 0
 16988 -16989  16990  1071  16993 0

c  1-1 --> 0
c    (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0 ∧ -p_1071) -> (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧ -b^{51, 22}_0)
c  in CNF:
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_2
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_1
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_0
c  in DIMACS:
 16988  16989 -16990  1071 -16991 0
 16988  16989 -16990  1071 -16992 0
 16988  16989 -16990  1071 -16993 0

c  0-1 --> -1
c    (-b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧ -p_1071) -> ( b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0)
c  in CNF:
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨  b^{51, 22}_2
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_1
c     b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨  b^{51, 22}_0
c  in DIMACS:
 16988  16989  16990  1071  16991 0
 16988  16989  16990  1071 -16992 0
 16988  16989  16990  1071  16993 0

c  -1-1 --> -2
c    ( b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧  b^{51, 21}_0 ∧ -p_1071) -> ( b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0)
c  in CNF:
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨  b^{51, 22}_2
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨  b^{51, 22}_1
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨  p_1071 ∨ -b^{51, 22}_0
c  in DIMACS:
-16988  16989 -16990  1071  16991 0
-16988  16989 -16990  1071  16992 0
-16988  16989 -16990  1071 -16993 0

c  -2-1 --> break 
c    ( b^{51, 21}_2 ∧  b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨  b^{51, 21}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-16988 -16989  16990  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 21}_2 ∧ -b^{51, 21}_1 ∧ -b^{51, 21}_0 ∧ true) 
c  in CNF:
c    -b^{51, 21}_2 ∨  b^{51, 21}_1 ∨  b^{51, 21}_0 ∨ false 
c  in DIMACS:
-16988  16989  16990  0

c  3 does not represent an automaton state.
c    -(-b^{51, 21}_2 ∧  b^{51, 21}_1 ∧  b^{51, 21}_0 ∧ true) 
c  in CNF:
c     b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ false 
c  in DIMACS:
 16988 -16989 -16990  0
c  -3 does not represent an automaton state.
c    -( b^{51, 21}_2 ∧  b^{51, 21}_1 ∧  b^{51, 21}_0 ∧ true) 
c  in CNF:
c    -b^{51, 21}_2 ∨ -b^{51, 21}_1 ∨ -b^{51, 21}_0 ∨ false 
c  in DIMACS:
-16988 -16989 -16990  0

c i = 22
c  -2+1 --> -1
c    ( b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧  p_1122) -> ( b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧  b^{51, 23}_0)
c  in CNF:
c    -b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨  b^{51, 23}_2
c    -b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_1
c    -b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨  b^{51, 23}_0
c  in DIMACS:
-16991 -16992  16993 -1122  16994 0
-16991 -16992  16993 -1122 -16995 0
-16991 -16992  16993 -1122  16996 0

c  -1+1 --> 0
c    ( b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0 ∧  p_1122) -> (-b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧ -b^{51, 23}_0)
c  in CNF:
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_2
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_1
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_0
c  in DIMACS:
-16991  16992 -16993 -1122 -16994 0
-16991  16992 -16993 -1122 -16995 0
-16991  16992 -16993 -1122 -16996 0

c  0+1 --> 1
c    (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧  p_1122) -> (-b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧  b^{51, 23}_0)
c  in CNF:
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_2
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_1
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨  b^{51, 23}_0
c  in DIMACS:
 16991  16992  16993 -1122 -16994 0
 16991  16992  16993 -1122 -16995 0
 16991  16992  16993 -1122  16996 0

c  1+1 --> 2
c    (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0 ∧  p_1122) -> (-b^{51, 23}_2 ∧  b^{51, 23}_1 ∧ -b^{51, 23}_0)
c  in CNF:
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_2
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨  b^{51, 23}_1
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ -p_1122 ∨ -b^{51, 23}_0
c  in DIMACS:
 16991  16992 -16993 -1122 -16994 0
 16991  16992 -16993 -1122  16995 0
 16991  16992 -16993 -1122 -16996 0

c  2+1 --> break 
c    (-b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 16991 -16992  16993 -1122 1162 0


c  2-1 --> 1
c    (-b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧ -p_1122) -> (-b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧  b^{51, 23}_0)
c  in CNF:
c     b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_2
c     b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_1
c     b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨  b^{51, 23}_0
c  in DIMACS:
 16991 -16992  16993  1122 -16994 0
 16991 -16992  16993  1122 -16995 0
 16991 -16992  16993  1122  16996 0

c  1-1 --> 0
c    (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0 ∧ -p_1122) -> (-b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧ -b^{51, 23}_0)
c  in CNF:
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_2
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_1
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_0
c  in DIMACS:
 16991  16992 -16993  1122 -16994 0
 16991  16992 -16993  1122 -16995 0
 16991  16992 -16993  1122 -16996 0

c  0-1 --> -1
c    (-b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧ -p_1122) -> ( b^{51, 23}_2 ∧ -b^{51, 23}_1 ∧  b^{51, 23}_0)
c  in CNF:
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨  b^{51, 23}_2
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_1
c     b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨  b^{51, 23}_0
c  in DIMACS:
 16991  16992  16993  1122  16994 0
 16991  16992  16993  1122 -16995 0
 16991  16992  16993  1122  16996 0

c  -1-1 --> -2
c    ( b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧  b^{51, 22}_0 ∧ -p_1122) -> ( b^{51, 23}_2 ∧  b^{51, 23}_1 ∧ -b^{51, 23}_0)
c  in CNF:
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨  b^{51, 23}_2
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨  b^{51, 23}_1
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨  p_1122 ∨ -b^{51, 23}_0
c  in DIMACS:
-16991  16992 -16993  1122  16994 0
-16991  16992 -16993  1122  16995 0
-16991  16992 -16993  1122 -16996 0

c  -2-1 --> break 
c    ( b^{51, 22}_2 ∧  b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨  b^{51, 22}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-16991 -16992  16993  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{51, 22}_2 ∧ -b^{51, 22}_1 ∧ -b^{51, 22}_0 ∧ true) 
c  in CNF:
c    -b^{51, 22}_2 ∨  b^{51, 22}_1 ∨  b^{51, 22}_0 ∨ false 
c  in DIMACS:
-16991  16992  16993  0

c  3 does not represent an automaton state.
c    -(-b^{51, 22}_2 ∧  b^{51, 22}_1 ∧  b^{51, 22}_0 ∧ true) 
c  in CNF:
c     b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ false 
c  in DIMACS:
 16991 -16992 -16993  0
c  -3 does not represent an automaton state.
c    -( b^{51, 22}_2 ∧  b^{51, 22}_1 ∧  b^{51, 22}_0 ∧ true) 
c  in CNF:
c    -b^{51, 22}_2 ∨ -b^{51, 22}_1 ∨ -b^{51, 22}_0 ∨ false 
c  in DIMACS:
-16991 -16992 -16993  0

c INIT for k = 52
c    -b^{52, 1}_2
c    -b^{52, 1}_1
c    -b^{52, 1}_0
c  in DIMACS:
-16997 0
-16998 0
-16999 0

c Transitions for k = 52
c i = 1
c  -2+1 --> -1
c    ( b^{52, 1}_2 ∧  b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧  p_52) -> ( b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0)
c  in CNF:
c    -b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨  b^{52, 2}_2
c    -b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_1
c    -b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨  b^{52, 2}_0
c  in DIMACS:
-16997 -16998  16999 -52  17000 0
-16997 -16998  16999 -52 -17001 0
-16997 -16998  16999 -52  17002 0

c  -1+1 --> 0
c    ( b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧  b^{52, 1}_0 ∧  p_52) -> (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧ -b^{52, 2}_0)
c  in CNF:
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_2
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_1
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_0
c  in DIMACS:
-16997  16998 -16999 -52 -17000 0
-16997  16998 -16999 -52 -17001 0
-16997  16998 -16999 -52 -17002 0

c  0+1 --> 1
c    (-b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧  p_52) -> (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0)
c  in CNF:
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_2
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_1
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨  b^{52, 2}_0
c  in DIMACS:
 16997  16998  16999 -52 -17000 0
 16997  16998  16999 -52 -17001 0
 16997  16998  16999 -52  17002 0

c  1+1 --> 2
c    (-b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧  b^{52, 1}_0 ∧  p_52) -> (-b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0)
c  in CNF:
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_2
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨  b^{52, 2}_1
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ -p_52 ∨ -b^{52, 2}_0
c  in DIMACS:
 16997  16998 -16999 -52 -17000 0
 16997  16998 -16999 -52  17001 0
 16997  16998 -16999 -52 -17002 0

c  2+1 --> break 
c    (-b^{52, 1}_2 ∧  b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧  p_52) -> break
c  in CNF:
c     b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ -p_52 ∨ break
c  in DIMACS:
 16997 -16998  16999 -52 1162 0


c  2-1 --> 1
c    (-b^{52, 1}_2 ∧  b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧ -p_52) -> (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0)
c  in CNF:
c     b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_2
c     b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_1
c     b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨  b^{52, 2}_0
c  in DIMACS:
 16997 -16998  16999  52 -17000 0
 16997 -16998  16999  52 -17001 0
 16997 -16998  16999  52  17002 0

c  1-1 --> 0
c    (-b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧  b^{52, 1}_0 ∧ -p_52) -> (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧ -b^{52, 2}_0)
c  in CNF:
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_2
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_1
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_0
c  in DIMACS:
 16997  16998 -16999  52 -17000 0
 16997  16998 -16999  52 -17001 0
 16997  16998 -16999  52 -17002 0

c  0-1 --> -1
c    (-b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧ -p_52) -> ( b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0)
c  in CNF:
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨  b^{52, 2}_2
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_1
c     b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨  b^{52, 2}_0
c  in DIMACS:
 16997  16998  16999  52  17000 0
 16997  16998  16999  52 -17001 0
 16997  16998  16999  52  17002 0

c  -1-1 --> -2
c    ( b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧  b^{52, 1}_0 ∧ -p_52) -> ( b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0)
c  in CNF:
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨  b^{52, 2}_2
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨  b^{52, 2}_1
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨  p_52 ∨ -b^{52, 2}_0
c  in DIMACS:
-16997  16998 -16999  52  17000 0
-16997  16998 -16999  52  17001 0
-16997  16998 -16999  52 -17002 0

c  -2-1 --> break 
c    ( b^{52, 1}_2 ∧  b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧ -p_52) -> break
c  in CNF:
c    -b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨  b^{52, 1}_0 ∨  p_52 ∨ break
c  in DIMACS:
-16997 -16998  16999  52 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 1}_2 ∧ -b^{52, 1}_1 ∧ -b^{52, 1}_0 ∧ true) 
c  in CNF:
c    -b^{52, 1}_2 ∨  b^{52, 1}_1 ∨  b^{52, 1}_0 ∨ false 
c  in DIMACS:
-16997  16998  16999  0

c  3 does not represent an automaton state.
c    -(-b^{52, 1}_2 ∧  b^{52, 1}_1 ∧  b^{52, 1}_0 ∧ true) 
c  in CNF:
c     b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ false 
c  in DIMACS:
 16997 -16998 -16999  0
c  -3 does not represent an automaton state.
c    -( b^{52, 1}_2 ∧  b^{52, 1}_1 ∧  b^{52, 1}_0 ∧ true) 
c  in CNF:
c    -b^{52, 1}_2 ∨ -b^{52, 1}_1 ∨ -b^{52, 1}_0 ∨ false 
c  in DIMACS:
-16997 -16998 -16999  0

c i = 2
c  -2+1 --> -1
c    ( b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧  p_104) -> ( b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0)
c  in CNF:
c    -b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨  b^{52, 3}_2
c    -b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_1
c    -b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨  b^{52, 3}_0
c  in DIMACS:
-17000 -17001  17002 -104  17003 0
-17000 -17001  17002 -104 -17004 0
-17000 -17001  17002 -104  17005 0

c  -1+1 --> 0
c    ( b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0 ∧  p_104) -> (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧ -b^{52, 3}_0)
c  in CNF:
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_2
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_1
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_0
c  in DIMACS:
-17000  17001 -17002 -104 -17003 0
-17000  17001 -17002 -104 -17004 0
-17000  17001 -17002 -104 -17005 0

c  0+1 --> 1
c    (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧  p_104) -> (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0)
c  in CNF:
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_2
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_1
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨  b^{52, 3}_0
c  in DIMACS:
 17000  17001  17002 -104 -17003 0
 17000  17001  17002 -104 -17004 0
 17000  17001  17002 -104  17005 0

c  1+1 --> 2
c    (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0 ∧  p_104) -> (-b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0)
c  in CNF:
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_2
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨  b^{52, 3}_1
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ -p_104 ∨ -b^{52, 3}_0
c  in DIMACS:
 17000  17001 -17002 -104 -17003 0
 17000  17001 -17002 -104  17004 0
 17000  17001 -17002 -104 -17005 0

c  2+1 --> break 
c    (-b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧  p_104) -> break
c  in CNF:
c     b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 17000 -17001  17002 -104 1162 0


c  2-1 --> 1
c    (-b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧ -p_104) -> (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0)
c  in CNF:
c     b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_2
c     b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_1
c     b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨  b^{52, 3}_0
c  in DIMACS:
 17000 -17001  17002  104 -17003 0
 17000 -17001  17002  104 -17004 0
 17000 -17001  17002  104  17005 0

c  1-1 --> 0
c    (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0 ∧ -p_104) -> (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧ -b^{52, 3}_0)
c  in CNF:
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_2
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_1
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_0
c  in DIMACS:
 17000  17001 -17002  104 -17003 0
 17000  17001 -17002  104 -17004 0
 17000  17001 -17002  104 -17005 0

c  0-1 --> -1
c    (-b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧ -p_104) -> ( b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0)
c  in CNF:
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨  b^{52, 3}_2
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_1
c     b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨  b^{52, 3}_0
c  in DIMACS:
 17000  17001  17002  104  17003 0
 17000  17001  17002  104 -17004 0
 17000  17001  17002  104  17005 0

c  -1-1 --> -2
c    ( b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧  b^{52, 2}_0 ∧ -p_104) -> ( b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0)
c  in CNF:
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨  b^{52, 3}_2
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨  b^{52, 3}_1
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨  p_104 ∨ -b^{52, 3}_0
c  in DIMACS:
-17000  17001 -17002  104  17003 0
-17000  17001 -17002  104  17004 0
-17000  17001 -17002  104 -17005 0

c  -2-1 --> break 
c    ( b^{52, 2}_2 ∧  b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨  b^{52, 2}_0 ∨  p_104 ∨ break
c  in DIMACS:
-17000 -17001  17002  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 2}_2 ∧ -b^{52, 2}_1 ∧ -b^{52, 2}_0 ∧ true) 
c  in CNF:
c    -b^{52, 2}_2 ∨  b^{52, 2}_1 ∨  b^{52, 2}_0 ∨ false 
c  in DIMACS:
-17000  17001  17002  0

c  3 does not represent an automaton state.
c    -(-b^{52, 2}_2 ∧  b^{52, 2}_1 ∧  b^{52, 2}_0 ∧ true) 
c  in CNF:
c     b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ false 
c  in DIMACS:
 17000 -17001 -17002  0
c  -3 does not represent an automaton state.
c    -( b^{52, 2}_2 ∧  b^{52, 2}_1 ∧  b^{52, 2}_0 ∧ true) 
c  in CNF:
c    -b^{52, 2}_2 ∨ -b^{52, 2}_1 ∨ -b^{52, 2}_0 ∨ false 
c  in DIMACS:
-17000 -17001 -17002  0

c i = 3
c  -2+1 --> -1
c    ( b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧  p_156) -> ( b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0)
c  in CNF:
c    -b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨  b^{52, 4}_2
c    -b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_1
c    -b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨  b^{52, 4}_0
c  in DIMACS:
-17003 -17004  17005 -156  17006 0
-17003 -17004  17005 -156 -17007 0
-17003 -17004  17005 -156  17008 0

c  -1+1 --> 0
c    ( b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0 ∧  p_156) -> (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧ -b^{52, 4}_0)
c  in CNF:
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_2
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_1
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_0
c  in DIMACS:
-17003  17004 -17005 -156 -17006 0
-17003  17004 -17005 -156 -17007 0
-17003  17004 -17005 -156 -17008 0

c  0+1 --> 1
c    (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧  p_156) -> (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0)
c  in CNF:
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_2
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_1
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨  b^{52, 4}_0
c  in DIMACS:
 17003  17004  17005 -156 -17006 0
 17003  17004  17005 -156 -17007 0
 17003  17004  17005 -156  17008 0

c  1+1 --> 2
c    (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0 ∧  p_156) -> (-b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0)
c  in CNF:
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_2
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨  b^{52, 4}_1
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ -p_156 ∨ -b^{52, 4}_0
c  in DIMACS:
 17003  17004 -17005 -156 -17006 0
 17003  17004 -17005 -156  17007 0
 17003  17004 -17005 -156 -17008 0

c  2+1 --> break 
c    (-b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧  p_156) -> break
c  in CNF:
c     b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 17003 -17004  17005 -156 1162 0


c  2-1 --> 1
c    (-b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧ -p_156) -> (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0)
c  in CNF:
c     b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_2
c     b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_1
c     b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨  b^{52, 4}_0
c  in DIMACS:
 17003 -17004  17005  156 -17006 0
 17003 -17004  17005  156 -17007 0
 17003 -17004  17005  156  17008 0

c  1-1 --> 0
c    (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0 ∧ -p_156) -> (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧ -b^{52, 4}_0)
c  in CNF:
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_2
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_1
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_0
c  in DIMACS:
 17003  17004 -17005  156 -17006 0
 17003  17004 -17005  156 -17007 0
 17003  17004 -17005  156 -17008 0

c  0-1 --> -1
c    (-b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧ -p_156) -> ( b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0)
c  in CNF:
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨  b^{52, 4}_2
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_1
c     b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨  b^{52, 4}_0
c  in DIMACS:
 17003  17004  17005  156  17006 0
 17003  17004  17005  156 -17007 0
 17003  17004  17005  156  17008 0

c  -1-1 --> -2
c    ( b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧  b^{52, 3}_0 ∧ -p_156) -> ( b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0)
c  in CNF:
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨  b^{52, 4}_2
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨  b^{52, 4}_1
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨  p_156 ∨ -b^{52, 4}_0
c  in DIMACS:
-17003  17004 -17005  156  17006 0
-17003  17004 -17005  156  17007 0
-17003  17004 -17005  156 -17008 0

c  -2-1 --> break 
c    ( b^{52, 3}_2 ∧  b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨  b^{52, 3}_0 ∨  p_156 ∨ break
c  in DIMACS:
-17003 -17004  17005  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 3}_2 ∧ -b^{52, 3}_1 ∧ -b^{52, 3}_0 ∧ true) 
c  in CNF:
c    -b^{52, 3}_2 ∨  b^{52, 3}_1 ∨  b^{52, 3}_0 ∨ false 
c  in DIMACS:
-17003  17004  17005  0

c  3 does not represent an automaton state.
c    -(-b^{52, 3}_2 ∧  b^{52, 3}_1 ∧  b^{52, 3}_0 ∧ true) 
c  in CNF:
c     b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ false 
c  in DIMACS:
 17003 -17004 -17005  0
c  -3 does not represent an automaton state.
c    -( b^{52, 3}_2 ∧  b^{52, 3}_1 ∧  b^{52, 3}_0 ∧ true) 
c  in CNF:
c    -b^{52, 3}_2 ∨ -b^{52, 3}_1 ∨ -b^{52, 3}_0 ∨ false 
c  in DIMACS:
-17003 -17004 -17005  0

c i = 4
c  -2+1 --> -1
c    ( b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧  p_208) -> ( b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0)
c  in CNF:
c    -b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨  b^{52, 5}_2
c    -b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_1
c    -b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨  b^{52, 5}_0
c  in DIMACS:
-17006 -17007  17008 -208  17009 0
-17006 -17007  17008 -208 -17010 0
-17006 -17007  17008 -208  17011 0

c  -1+1 --> 0
c    ( b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0 ∧  p_208) -> (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧ -b^{52, 5}_0)
c  in CNF:
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_2
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_1
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_0
c  in DIMACS:
-17006  17007 -17008 -208 -17009 0
-17006  17007 -17008 -208 -17010 0
-17006  17007 -17008 -208 -17011 0

c  0+1 --> 1
c    (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧  p_208) -> (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0)
c  in CNF:
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_2
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_1
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨  b^{52, 5}_0
c  in DIMACS:
 17006  17007  17008 -208 -17009 0
 17006  17007  17008 -208 -17010 0
 17006  17007  17008 -208  17011 0

c  1+1 --> 2
c    (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0 ∧  p_208) -> (-b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0)
c  in CNF:
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_2
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨  b^{52, 5}_1
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ -p_208 ∨ -b^{52, 5}_0
c  in DIMACS:
 17006  17007 -17008 -208 -17009 0
 17006  17007 -17008 -208  17010 0
 17006  17007 -17008 -208 -17011 0

c  2+1 --> break 
c    (-b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧  p_208) -> break
c  in CNF:
c     b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 17006 -17007  17008 -208 1162 0


c  2-1 --> 1
c    (-b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧ -p_208) -> (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0)
c  in CNF:
c     b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_2
c     b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_1
c     b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨  b^{52, 5}_0
c  in DIMACS:
 17006 -17007  17008  208 -17009 0
 17006 -17007  17008  208 -17010 0
 17006 -17007  17008  208  17011 0

c  1-1 --> 0
c    (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0 ∧ -p_208) -> (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧ -b^{52, 5}_0)
c  in CNF:
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_2
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_1
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_0
c  in DIMACS:
 17006  17007 -17008  208 -17009 0
 17006  17007 -17008  208 -17010 0
 17006  17007 -17008  208 -17011 0

c  0-1 --> -1
c    (-b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧ -p_208) -> ( b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0)
c  in CNF:
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨  b^{52, 5}_2
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_1
c     b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨  b^{52, 5}_0
c  in DIMACS:
 17006  17007  17008  208  17009 0
 17006  17007  17008  208 -17010 0
 17006  17007  17008  208  17011 0

c  -1-1 --> -2
c    ( b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧  b^{52, 4}_0 ∧ -p_208) -> ( b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0)
c  in CNF:
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨  b^{52, 5}_2
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨  b^{52, 5}_1
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨  p_208 ∨ -b^{52, 5}_0
c  in DIMACS:
-17006  17007 -17008  208  17009 0
-17006  17007 -17008  208  17010 0
-17006  17007 -17008  208 -17011 0

c  -2-1 --> break 
c    ( b^{52, 4}_2 ∧  b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨  b^{52, 4}_0 ∨  p_208 ∨ break
c  in DIMACS:
-17006 -17007  17008  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 4}_2 ∧ -b^{52, 4}_1 ∧ -b^{52, 4}_0 ∧ true) 
c  in CNF:
c    -b^{52, 4}_2 ∨  b^{52, 4}_1 ∨  b^{52, 4}_0 ∨ false 
c  in DIMACS:
-17006  17007  17008  0

c  3 does not represent an automaton state.
c    -(-b^{52, 4}_2 ∧  b^{52, 4}_1 ∧  b^{52, 4}_0 ∧ true) 
c  in CNF:
c     b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ false 
c  in DIMACS:
 17006 -17007 -17008  0
c  -3 does not represent an automaton state.
c    -( b^{52, 4}_2 ∧  b^{52, 4}_1 ∧  b^{52, 4}_0 ∧ true) 
c  in CNF:
c    -b^{52, 4}_2 ∨ -b^{52, 4}_1 ∨ -b^{52, 4}_0 ∨ false 
c  in DIMACS:
-17006 -17007 -17008  0

c i = 5
c  -2+1 --> -1
c    ( b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧  p_260) -> ( b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0)
c  in CNF:
c    -b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨  b^{52, 6}_2
c    -b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_1
c    -b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨  b^{52, 6}_0
c  in DIMACS:
-17009 -17010  17011 -260  17012 0
-17009 -17010  17011 -260 -17013 0
-17009 -17010  17011 -260  17014 0

c  -1+1 --> 0
c    ( b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0 ∧  p_260) -> (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧ -b^{52, 6}_0)
c  in CNF:
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_2
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_1
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_0
c  in DIMACS:
-17009  17010 -17011 -260 -17012 0
-17009  17010 -17011 -260 -17013 0
-17009  17010 -17011 -260 -17014 0

c  0+1 --> 1
c    (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧  p_260) -> (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0)
c  in CNF:
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_2
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_1
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨  b^{52, 6}_0
c  in DIMACS:
 17009  17010  17011 -260 -17012 0
 17009  17010  17011 -260 -17013 0
 17009  17010  17011 -260  17014 0

c  1+1 --> 2
c    (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0 ∧  p_260) -> (-b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0)
c  in CNF:
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_2
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨  b^{52, 6}_1
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ -p_260 ∨ -b^{52, 6}_0
c  in DIMACS:
 17009  17010 -17011 -260 -17012 0
 17009  17010 -17011 -260  17013 0
 17009  17010 -17011 -260 -17014 0

c  2+1 --> break 
c    (-b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧  p_260) -> break
c  in CNF:
c     b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 17009 -17010  17011 -260 1162 0


c  2-1 --> 1
c    (-b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧ -p_260) -> (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0)
c  in CNF:
c     b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_2
c     b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_1
c     b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨  b^{52, 6}_0
c  in DIMACS:
 17009 -17010  17011  260 -17012 0
 17009 -17010  17011  260 -17013 0
 17009 -17010  17011  260  17014 0

c  1-1 --> 0
c    (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0 ∧ -p_260) -> (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧ -b^{52, 6}_0)
c  in CNF:
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_2
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_1
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_0
c  in DIMACS:
 17009  17010 -17011  260 -17012 0
 17009  17010 -17011  260 -17013 0
 17009  17010 -17011  260 -17014 0

c  0-1 --> -1
c    (-b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧ -p_260) -> ( b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0)
c  in CNF:
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨  b^{52, 6}_2
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_1
c     b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨  b^{52, 6}_0
c  in DIMACS:
 17009  17010  17011  260  17012 0
 17009  17010  17011  260 -17013 0
 17009  17010  17011  260  17014 0

c  -1-1 --> -2
c    ( b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧  b^{52, 5}_0 ∧ -p_260) -> ( b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0)
c  in CNF:
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨  b^{52, 6}_2
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨  b^{52, 6}_1
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨  p_260 ∨ -b^{52, 6}_0
c  in DIMACS:
-17009  17010 -17011  260  17012 0
-17009  17010 -17011  260  17013 0
-17009  17010 -17011  260 -17014 0

c  -2-1 --> break 
c    ( b^{52, 5}_2 ∧  b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨  b^{52, 5}_0 ∨  p_260 ∨ break
c  in DIMACS:
-17009 -17010  17011  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 5}_2 ∧ -b^{52, 5}_1 ∧ -b^{52, 5}_0 ∧ true) 
c  in CNF:
c    -b^{52, 5}_2 ∨  b^{52, 5}_1 ∨  b^{52, 5}_0 ∨ false 
c  in DIMACS:
-17009  17010  17011  0

c  3 does not represent an automaton state.
c    -(-b^{52, 5}_2 ∧  b^{52, 5}_1 ∧  b^{52, 5}_0 ∧ true) 
c  in CNF:
c     b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ false 
c  in DIMACS:
 17009 -17010 -17011  0
c  -3 does not represent an automaton state.
c    -( b^{52, 5}_2 ∧  b^{52, 5}_1 ∧  b^{52, 5}_0 ∧ true) 
c  in CNF:
c    -b^{52, 5}_2 ∨ -b^{52, 5}_1 ∨ -b^{52, 5}_0 ∨ false 
c  in DIMACS:
-17009 -17010 -17011  0

c i = 6
c  -2+1 --> -1
c    ( b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧  p_312) -> ( b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0)
c  in CNF:
c    -b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨  b^{52, 7}_2
c    -b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_1
c    -b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨  b^{52, 7}_0
c  in DIMACS:
-17012 -17013  17014 -312  17015 0
-17012 -17013  17014 -312 -17016 0
-17012 -17013  17014 -312  17017 0

c  -1+1 --> 0
c    ( b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0 ∧  p_312) -> (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧ -b^{52, 7}_0)
c  in CNF:
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_2
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_1
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_0
c  in DIMACS:
-17012  17013 -17014 -312 -17015 0
-17012  17013 -17014 -312 -17016 0
-17012  17013 -17014 -312 -17017 0

c  0+1 --> 1
c    (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧  p_312) -> (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0)
c  in CNF:
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_2
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_1
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨  b^{52, 7}_0
c  in DIMACS:
 17012  17013  17014 -312 -17015 0
 17012  17013  17014 -312 -17016 0
 17012  17013  17014 -312  17017 0

c  1+1 --> 2
c    (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0 ∧  p_312) -> (-b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0)
c  in CNF:
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_2
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨  b^{52, 7}_1
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ -p_312 ∨ -b^{52, 7}_0
c  in DIMACS:
 17012  17013 -17014 -312 -17015 0
 17012  17013 -17014 -312  17016 0
 17012  17013 -17014 -312 -17017 0

c  2+1 --> break 
c    (-b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧  p_312) -> break
c  in CNF:
c     b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 17012 -17013  17014 -312 1162 0


c  2-1 --> 1
c    (-b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧ -p_312) -> (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0)
c  in CNF:
c     b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_2
c     b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_1
c     b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨  b^{52, 7}_0
c  in DIMACS:
 17012 -17013  17014  312 -17015 0
 17012 -17013  17014  312 -17016 0
 17012 -17013  17014  312  17017 0

c  1-1 --> 0
c    (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0 ∧ -p_312) -> (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧ -b^{52, 7}_0)
c  in CNF:
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_2
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_1
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_0
c  in DIMACS:
 17012  17013 -17014  312 -17015 0
 17012  17013 -17014  312 -17016 0
 17012  17013 -17014  312 -17017 0

c  0-1 --> -1
c    (-b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧ -p_312) -> ( b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0)
c  in CNF:
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨  b^{52, 7}_2
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_1
c     b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨  b^{52, 7}_0
c  in DIMACS:
 17012  17013  17014  312  17015 0
 17012  17013  17014  312 -17016 0
 17012  17013  17014  312  17017 0

c  -1-1 --> -2
c    ( b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧  b^{52, 6}_0 ∧ -p_312) -> ( b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0)
c  in CNF:
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨  b^{52, 7}_2
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨  b^{52, 7}_1
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨  p_312 ∨ -b^{52, 7}_0
c  in DIMACS:
-17012  17013 -17014  312  17015 0
-17012  17013 -17014  312  17016 0
-17012  17013 -17014  312 -17017 0

c  -2-1 --> break 
c    ( b^{52, 6}_2 ∧  b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨  b^{52, 6}_0 ∨  p_312 ∨ break
c  in DIMACS:
-17012 -17013  17014  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 6}_2 ∧ -b^{52, 6}_1 ∧ -b^{52, 6}_0 ∧ true) 
c  in CNF:
c    -b^{52, 6}_2 ∨  b^{52, 6}_1 ∨  b^{52, 6}_0 ∨ false 
c  in DIMACS:
-17012  17013  17014  0

c  3 does not represent an automaton state.
c    -(-b^{52, 6}_2 ∧  b^{52, 6}_1 ∧  b^{52, 6}_0 ∧ true) 
c  in CNF:
c     b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ false 
c  in DIMACS:
 17012 -17013 -17014  0
c  -3 does not represent an automaton state.
c    -( b^{52, 6}_2 ∧  b^{52, 6}_1 ∧  b^{52, 6}_0 ∧ true) 
c  in CNF:
c    -b^{52, 6}_2 ∨ -b^{52, 6}_1 ∨ -b^{52, 6}_0 ∨ false 
c  in DIMACS:
-17012 -17013 -17014  0

c i = 7
c  -2+1 --> -1
c    ( b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧  p_364) -> ( b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0)
c  in CNF:
c    -b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨  b^{52, 8}_2
c    -b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_1
c    -b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨  b^{52, 8}_0
c  in DIMACS:
-17015 -17016  17017 -364  17018 0
-17015 -17016  17017 -364 -17019 0
-17015 -17016  17017 -364  17020 0

c  -1+1 --> 0
c    ( b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0 ∧  p_364) -> (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧ -b^{52, 8}_0)
c  in CNF:
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_2
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_1
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_0
c  in DIMACS:
-17015  17016 -17017 -364 -17018 0
-17015  17016 -17017 -364 -17019 0
-17015  17016 -17017 -364 -17020 0

c  0+1 --> 1
c    (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧  p_364) -> (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0)
c  in CNF:
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_2
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_1
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨  b^{52, 8}_0
c  in DIMACS:
 17015  17016  17017 -364 -17018 0
 17015  17016  17017 -364 -17019 0
 17015  17016  17017 -364  17020 0

c  1+1 --> 2
c    (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0 ∧  p_364) -> (-b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0)
c  in CNF:
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_2
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨  b^{52, 8}_1
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ -p_364 ∨ -b^{52, 8}_0
c  in DIMACS:
 17015  17016 -17017 -364 -17018 0
 17015  17016 -17017 -364  17019 0
 17015  17016 -17017 -364 -17020 0

c  2+1 --> break 
c    (-b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧  p_364) -> break
c  in CNF:
c     b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 17015 -17016  17017 -364 1162 0


c  2-1 --> 1
c    (-b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧ -p_364) -> (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0)
c  in CNF:
c     b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_2
c     b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_1
c     b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨  b^{52, 8}_0
c  in DIMACS:
 17015 -17016  17017  364 -17018 0
 17015 -17016  17017  364 -17019 0
 17015 -17016  17017  364  17020 0

c  1-1 --> 0
c    (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0 ∧ -p_364) -> (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧ -b^{52, 8}_0)
c  in CNF:
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_2
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_1
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_0
c  in DIMACS:
 17015  17016 -17017  364 -17018 0
 17015  17016 -17017  364 -17019 0
 17015  17016 -17017  364 -17020 0

c  0-1 --> -1
c    (-b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧ -p_364) -> ( b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0)
c  in CNF:
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨  b^{52, 8}_2
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_1
c     b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨  b^{52, 8}_0
c  in DIMACS:
 17015  17016  17017  364  17018 0
 17015  17016  17017  364 -17019 0
 17015  17016  17017  364  17020 0

c  -1-1 --> -2
c    ( b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧  b^{52, 7}_0 ∧ -p_364) -> ( b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0)
c  in CNF:
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨  b^{52, 8}_2
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨  b^{52, 8}_1
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨  p_364 ∨ -b^{52, 8}_0
c  in DIMACS:
-17015  17016 -17017  364  17018 0
-17015  17016 -17017  364  17019 0
-17015  17016 -17017  364 -17020 0

c  -2-1 --> break 
c    ( b^{52, 7}_2 ∧  b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨  b^{52, 7}_0 ∨  p_364 ∨ break
c  in DIMACS:
-17015 -17016  17017  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 7}_2 ∧ -b^{52, 7}_1 ∧ -b^{52, 7}_0 ∧ true) 
c  in CNF:
c    -b^{52, 7}_2 ∨  b^{52, 7}_1 ∨  b^{52, 7}_0 ∨ false 
c  in DIMACS:
-17015  17016  17017  0

c  3 does not represent an automaton state.
c    -(-b^{52, 7}_2 ∧  b^{52, 7}_1 ∧  b^{52, 7}_0 ∧ true) 
c  in CNF:
c     b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ false 
c  in DIMACS:
 17015 -17016 -17017  0
c  -3 does not represent an automaton state.
c    -( b^{52, 7}_2 ∧  b^{52, 7}_1 ∧  b^{52, 7}_0 ∧ true) 
c  in CNF:
c    -b^{52, 7}_2 ∨ -b^{52, 7}_1 ∨ -b^{52, 7}_0 ∨ false 
c  in DIMACS:
-17015 -17016 -17017  0

c i = 8
c  -2+1 --> -1
c    ( b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧  p_416) -> ( b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0)
c  in CNF:
c    -b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨  b^{52, 9}_2
c    -b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_1
c    -b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨  b^{52, 9}_0
c  in DIMACS:
-17018 -17019  17020 -416  17021 0
-17018 -17019  17020 -416 -17022 0
-17018 -17019  17020 -416  17023 0

c  -1+1 --> 0
c    ( b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0 ∧  p_416) -> (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧ -b^{52, 9}_0)
c  in CNF:
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_2
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_1
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_0
c  in DIMACS:
-17018  17019 -17020 -416 -17021 0
-17018  17019 -17020 -416 -17022 0
-17018  17019 -17020 -416 -17023 0

c  0+1 --> 1
c    (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧  p_416) -> (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0)
c  in CNF:
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_2
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_1
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨  b^{52, 9}_0
c  in DIMACS:
 17018  17019  17020 -416 -17021 0
 17018  17019  17020 -416 -17022 0
 17018  17019  17020 -416  17023 0

c  1+1 --> 2
c    (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0 ∧  p_416) -> (-b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0)
c  in CNF:
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_2
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨  b^{52, 9}_1
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ -p_416 ∨ -b^{52, 9}_0
c  in DIMACS:
 17018  17019 -17020 -416 -17021 0
 17018  17019 -17020 -416  17022 0
 17018  17019 -17020 -416 -17023 0

c  2+1 --> break 
c    (-b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧  p_416) -> break
c  in CNF:
c     b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 17018 -17019  17020 -416 1162 0


c  2-1 --> 1
c    (-b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧ -p_416) -> (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0)
c  in CNF:
c     b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_2
c     b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_1
c     b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨  b^{52, 9}_0
c  in DIMACS:
 17018 -17019  17020  416 -17021 0
 17018 -17019  17020  416 -17022 0
 17018 -17019  17020  416  17023 0

c  1-1 --> 0
c    (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0 ∧ -p_416) -> (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧ -b^{52, 9}_0)
c  in CNF:
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_2
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_1
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_0
c  in DIMACS:
 17018  17019 -17020  416 -17021 0
 17018  17019 -17020  416 -17022 0
 17018  17019 -17020  416 -17023 0

c  0-1 --> -1
c    (-b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧ -p_416) -> ( b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0)
c  in CNF:
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨  b^{52, 9}_2
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_1
c     b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨  b^{52, 9}_0
c  in DIMACS:
 17018  17019  17020  416  17021 0
 17018  17019  17020  416 -17022 0
 17018  17019  17020  416  17023 0

c  -1-1 --> -2
c    ( b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧  b^{52, 8}_0 ∧ -p_416) -> ( b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0)
c  in CNF:
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨  b^{52, 9}_2
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨  b^{52, 9}_1
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨  p_416 ∨ -b^{52, 9}_0
c  in DIMACS:
-17018  17019 -17020  416  17021 0
-17018  17019 -17020  416  17022 0
-17018  17019 -17020  416 -17023 0

c  -2-1 --> break 
c    ( b^{52, 8}_2 ∧  b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨  b^{52, 8}_0 ∨  p_416 ∨ break
c  in DIMACS:
-17018 -17019  17020  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 8}_2 ∧ -b^{52, 8}_1 ∧ -b^{52, 8}_0 ∧ true) 
c  in CNF:
c    -b^{52, 8}_2 ∨  b^{52, 8}_1 ∨  b^{52, 8}_0 ∨ false 
c  in DIMACS:
-17018  17019  17020  0

c  3 does not represent an automaton state.
c    -(-b^{52, 8}_2 ∧  b^{52, 8}_1 ∧  b^{52, 8}_0 ∧ true) 
c  in CNF:
c     b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ false 
c  in DIMACS:
 17018 -17019 -17020  0
c  -3 does not represent an automaton state.
c    -( b^{52, 8}_2 ∧  b^{52, 8}_1 ∧  b^{52, 8}_0 ∧ true) 
c  in CNF:
c    -b^{52, 8}_2 ∨ -b^{52, 8}_1 ∨ -b^{52, 8}_0 ∨ false 
c  in DIMACS:
-17018 -17019 -17020  0

c i = 9
c  -2+1 --> -1
c    ( b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧  p_468) -> ( b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0)
c  in CNF:
c    -b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨  b^{52, 10}_2
c    -b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_1
c    -b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨  b^{52, 10}_0
c  in DIMACS:
-17021 -17022  17023 -468  17024 0
-17021 -17022  17023 -468 -17025 0
-17021 -17022  17023 -468  17026 0

c  -1+1 --> 0
c    ( b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0 ∧  p_468) -> (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧ -b^{52, 10}_0)
c  in CNF:
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_2
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_1
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_0
c  in DIMACS:
-17021  17022 -17023 -468 -17024 0
-17021  17022 -17023 -468 -17025 0
-17021  17022 -17023 -468 -17026 0

c  0+1 --> 1
c    (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧  p_468) -> (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0)
c  in CNF:
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_2
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_1
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨  b^{52, 10}_0
c  in DIMACS:
 17021  17022  17023 -468 -17024 0
 17021  17022  17023 -468 -17025 0
 17021  17022  17023 -468  17026 0

c  1+1 --> 2
c    (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0 ∧  p_468) -> (-b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0)
c  in CNF:
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_2
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨  b^{52, 10}_1
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ -p_468 ∨ -b^{52, 10}_0
c  in DIMACS:
 17021  17022 -17023 -468 -17024 0
 17021  17022 -17023 -468  17025 0
 17021  17022 -17023 -468 -17026 0

c  2+1 --> break 
c    (-b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧  p_468) -> break
c  in CNF:
c     b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 17021 -17022  17023 -468 1162 0


c  2-1 --> 1
c    (-b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧ -p_468) -> (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0)
c  in CNF:
c     b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_2
c     b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_1
c     b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨  b^{52, 10}_0
c  in DIMACS:
 17021 -17022  17023  468 -17024 0
 17021 -17022  17023  468 -17025 0
 17021 -17022  17023  468  17026 0

c  1-1 --> 0
c    (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0 ∧ -p_468) -> (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧ -b^{52, 10}_0)
c  in CNF:
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_2
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_1
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_0
c  in DIMACS:
 17021  17022 -17023  468 -17024 0
 17021  17022 -17023  468 -17025 0
 17021  17022 -17023  468 -17026 0

c  0-1 --> -1
c    (-b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧ -p_468) -> ( b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0)
c  in CNF:
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨  b^{52, 10}_2
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_1
c     b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨  b^{52, 10}_0
c  in DIMACS:
 17021  17022  17023  468  17024 0
 17021  17022  17023  468 -17025 0
 17021  17022  17023  468  17026 0

c  -1-1 --> -2
c    ( b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧  b^{52, 9}_0 ∧ -p_468) -> ( b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0)
c  in CNF:
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨  b^{52, 10}_2
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨  b^{52, 10}_1
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨  p_468 ∨ -b^{52, 10}_0
c  in DIMACS:
-17021  17022 -17023  468  17024 0
-17021  17022 -17023  468  17025 0
-17021  17022 -17023  468 -17026 0

c  -2-1 --> break 
c    ( b^{52, 9}_2 ∧  b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨  b^{52, 9}_0 ∨  p_468 ∨ break
c  in DIMACS:
-17021 -17022  17023  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 9}_2 ∧ -b^{52, 9}_1 ∧ -b^{52, 9}_0 ∧ true) 
c  in CNF:
c    -b^{52, 9}_2 ∨  b^{52, 9}_1 ∨  b^{52, 9}_0 ∨ false 
c  in DIMACS:
-17021  17022  17023  0

c  3 does not represent an automaton state.
c    -(-b^{52, 9}_2 ∧  b^{52, 9}_1 ∧  b^{52, 9}_0 ∧ true) 
c  in CNF:
c     b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ false 
c  in DIMACS:
 17021 -17022 -17023  0
c  -3 does not represent an automaton state.
c    -( b^{52, 9}_2 ∧  b^{52, 9}_1 ∧  b^{52, 9}_0 ∧ true) 
c  in CNF:
c    -b^{52, 9}_2 ∨ -b^{52, 9}_1 ∨ -b^{52, 9}_0 ∨ false 
c  in DIMACS:
-17021 -17022 -17023  0

c i = 10
c  -2+1 --> -1
c    ( b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧  p_520) -> ( b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0)
c  in CNF:
c    -b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨  b^{52, 11}_2
c    -b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_1
c    -b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨  b^{52, 11}_0
c  in DIMACS:
-17024 -17025  17026 -520  17027 0
-17024 -17025  17026 -520 -17028 0
-17024 -17025  17026 -520  17029 0

c  -1+1 --> 0
c    ( b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0 ∧  p_520) -> (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧ -b^{52, 11}_0)
c  in CNF:
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_2
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_1
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_0
c  in DIMACS:
-17024  17025 -17026 -520 -17027 0
-17024  17025 -17026 -520 -17028 0
-17024  17025 -17026 -520 -17029 0

c  0+1 --> 1
c    (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧  p_520) -> (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0)
c  in CNF:
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_2
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_1
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨  b^{52, 11}_0
c  in DIMACS:
 17024  17025  17026 -520 -17027 0
 17024  17025  17026 -520 -17028 0
 17024  17025  17026 -520  17029 0

c  1+1 --> 2
c    (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0 ∧  p_520) -> (-b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0)
c  in CNF:
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_2
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨  b^{52, 11}_1
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ -p_520 ∨ -b^{52, 11}_0
c  in DIMACS:
 17024  17025 -17026 -520 -17027 0
 17024  17025 -17026 -520  17028 0
 17024  17025 -17026 -520 -17029 0

c  2+1 --> break 
c    (-b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧  p_520) -> break
c  in CNF:
c     b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 17024 -17025  17026 -520 1162 0


c  2-1 --> 1
c    (-b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧ -p_520) -> (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0)
c  in CNF:
c     b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_2
c     b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_1
c     b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨  b^{52, 11}_0
c  in DIMACS:
 17024 -17025  17026  520 -17027 0
 17024 -17025  17026  520 -17028 0
 17024 -17025  17026  520  17029 0

c  1-1 --> 0
c    (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0 ∧ -p_520) -> (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧ -b^{52, 11}_0)
c  in CNF:
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_2
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_1
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_0
c  in DIMACS:
 17024  17025 -17026  520 -17027 0
 17024  17025 -17026  520 -17028 0
 17024  17025 -17026  520 -17029 0

c  0-1 --> -1
c    (-b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧ -p_520) -> ( b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0)
c  in CNF:
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨  b^{52, 11}_2
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_1
c     b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨  b^{52, 11}_0
c  in DIMACS:
 17024  17025  17026  520  17027 0
 17024  17025  17026  520 -17028 0
 17024  17025  17026  520  17029 0

c  -1-1 --> -2
c    ( b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧  b^{52, 10}_0 ∧ -p_520) -> ( b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0)
c  in CNF:
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨  b^{52, 11}_2
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨  b^{52, 11}_1
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨  p_520 ∨ -b^{52, 11}_0
c  in DIMACS:
-17024  17025 -17026  520  17027 0
-17024  17025 -17026  520  17028 0
-17024  17025 -17026  520 -17029 0

c  -2-1 --> break 
c    ( b^{52, 10}_2 ∧  b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨  b^{52, 10}_0 ∨  p_520 ∨ break
c  in DIMACS:
-17024 -17025  17026  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 10}_2 ∧ -b^{52, 10}_1 ∧ -b^{52, 10}_0 ∧ true) 
c  in CNF:
c    -b^{52, 10}_2 ∨  b^{52, 10}_1 ∨  b^{52, 10}_0 ∨ false 
c  in DIMACS:
-17024  17025  17026  0

c  3 does not represent an automaton state.
c    -(-b^{52, 10}_2 ∧  b^{52, 10}_1 ∧  b^{52, 10}_0 ∧ true) 
c  in CNF:
c     b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ false 
c  in DIMACS:
 17024 -17025 -17026  0
c  -3 does not represent an automaton state.
c    -( b^{52, 10}_2 ∧  b^{52, 10}_1 ∧  b^{52, 10}_0 ∧ true) 
c  in CNF:
c    -b^{52, 10}_2 ∨ -b^{52, 10}_1 ∨ -b^{52, 10}_0 ∨ false 
c  in DIMACS:
-17024 -17025 -17026  0

c i = 11
c  -2+1 --> -1
c    ( b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧  p_572) -> ( b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0)
c  in CNF:
c    -b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨  b^{52, 12}_2
c    -b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_1
c    -b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨  b^{52, 12}_0
c  in DIMACS:
-17027 -17028  17029 -572  17030 0
-17027 -17028  17029 -572 -17031 0
-17027 -17028  17029 -572  17032 0

c  -1+1 --> 0
c    ( b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0 ∧  p_572) -> (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧ -b^{52, 12}_0)
c  in CNF:
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_2
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_1
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_0
c  in DIMACS:
-17027  17028 -17029 -572 -17030 0
-17027  17028 -17029 -572 -17031 0
-17027  17028 -17029 -572 -17032 0

c  0+1 --> 1
c    (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧  p_572) -> (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0)
c  in CNF:
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_2
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_1
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨  b^{52, 12}_0
c  in DIMACS:
 17027  17028  17029 -572 -17030 0
 17027  17028  17029 -572 -17031 0
 17027  17028  17029 -572  17032 0

c  1+1 --> 2
c    (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0 ∧  p_572) -> (-b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0)
c  in CNF:
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_2
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨  b^{52, 12}_1
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ -p_572 ∨ -b^{52, 12}_0
c  in DIMACS:
 17027  17028 -17029 -572 -17030 0
 17027  17028 -17029 -572  17031 0
 17027  17028 -17029 -572 -17032 0

c  2+1 --> break 
c    (-b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧  p_572) -> break
c  in CNF:
c     b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 17027 -17028  17029 -572 1162 0


c  2-1 --> 1
c    (-b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧ -p_572) -> (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0)
c  in CNF:
c     b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_2
c     b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_1
c     b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨  b^{52, 12}_0
c  in DIMACS:
 17027 -17028  17029  572 -17030 0
 17027 -17028  17029  572 -17031 0
 17027 -17028  17029  572  17032 0

c  1-1 --> 0
c    (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0 ∧ -p_572) -> (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧ -b^{52, 12}_0)
c  in CNF:
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_2
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_1
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_0
c  in DIMACS:
 17027  17028 -17029  572 -17030 0
 17027  17028 -17029  572 -17031 0
 17027  17028 -17029  572 -17032 0

c  0-1 --> -1
c    (-b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧ -p_572) -> ( b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0)
c  in CNF:
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨  b^{52, 12}_2
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_1
c     b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨  b^{52, 12}_0
c  in DIMACS:
 17027  17028  17029  572  17030 0
 17027  17028  17029  572 -17031 0
 17027  17028  17029  572  17032 0

c  -1-1 --> -2
c    ( b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧  b^{52, 11}_0 ∧ -p_572) -> ( b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0)
c  in CNF:
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨  b^{52, 12}_2
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨  b^{52, 12}_1
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨  p_572 ∨ -b^{52, 12}_0
c  in DIMACS:
-17027  17028 -17029  572  17030 0
-17027  17028 -17029  572  17031 0
-17027  17028 -17029  572 -17032 0

c  -2-1 --> break 
c    ( b^{52, 11}_2 ∧  b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨  b^{52, 11}_0 ∨  p_572 ∨ break
c  in DIMACS:
-17027 -17028  17029  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 11}_2 ∧ -b^{52, 11}_1 ∧ -b^{52, 11}_0 ∧ true) 
c  in CNF:
c    -b^{52, 11}_2 ∨  b^{52, 11}_1 ∨  b^{52, 11}_0 ∨ false 
c  in DIMACS:
-17027  17028  17029  0

c  3 does not represent an automaton state.
c    -(-b^{52, 11}_2 ∧  b^{52, 11}_1 ∧  b^{52, 11}_0 ∧ true) 
c  in CNF:
c     b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ false 
c  in DIMACS:
 17027 -17028 -17029  0
c  -3 does not represent an automaton state.
c    -( b^{52, 11}_2 ∧  b^{52, 11}_1 ∧  b^{52, 11}_0 ∧ true) 
c  in CNF:
c    -b^{52, 11}_2 ∨ -b^{52, 11}_1 ∨ -b^{52, 11}_0 ∨ false 
c  in DIMACS:
-17027 -17028 -17029  0

c i = 12
c  -2+1 --> -1
c    ( b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧  p_624) -> ( b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0)
c  in CNF:
c    -b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨  b^{52, 13}_2
c    -b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_1
c    -b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨  b^{52, 13}_0
c  in DIMACS:
-17030 -17031  17032 -624  17033 0
-17030 -17031  17032 -624 -17034 0
-17030 -17031  17032 -624  17035 0

c  -1+1 --> 0
c    ( b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0 ∧  p_624) -> (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧ -b^{52, 13}_0)
c  in CNF:
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_2
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_1
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_0
c  in DIMACS:
-17030  17031 -17032 -624 -17033 0
-17030  17031 -17032 -624 -17034 0
-17030  17031 -17032 -624 -17035 0

c  0+1 --> 1
c    (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧  p_624) -> (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0)
c  in CNF:
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_2
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_1
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨  b^{52, 13}_0
c  in DIMACS:
 17030  17031  17032 -624 -17033 0
 17030  17031  17032 -624 -17034 0
 17030  17031  17032 -624  17035 0

c  1+1 --> 2
c    (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0 ∧  p_624) -> (-b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0)
c  in CNF:
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_2
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨  b^{52, 13}_1
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ -p_624 ∨ -b^{52, 13}_0
c  in DIMACS:
 17030  17031 -17032 -624 -17033 0
 17030  17031 -17032 -624  17034 0
 17030  17031 -17032 -624 -17035 0

c  2+1 --> break 
c    (-b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧  p_624) -> break
c  in CNF:
c     b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 17030 -17031  17032 -624 1162 0


c  2-1 --> 1
c    (-b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧ -p_624) -> (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0)
c  in CNF:
c     b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_2
c     b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_1
c     b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨  b^{52, 13}_0
c  in DIMACS:
 17030 -17031  17032  624 -17033 0
 17030 -17031  17032  624 -17034 0
 17030 -17031  17032  624  17035 0

c  1-1 --> 0
c    (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0 ∧ -p_624) -> (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧ -b^{52, 13}_0)
c  in CNF:
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_2
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_1
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_0
c  in DIMACS:
 17030  17031 -17032  624 -17033 0
 17030  17031 -17032  624 -17034 0
 17030  17031 -17032  624 -17035 0

c  0-1 --> -1
c    (-b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧ -p_624) -> ( b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0)
c  in CNF:
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨  b^{52, 13}_2
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_1
c     b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨  b^{52, 13}_0
c  in DIMACS:
 17030  17031  17032  624  17033 0
 17030  17031  17032  624 -17034 0
 17030  17031  17032  624  17035 0

c  -1-1 --> -2
c    ( b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧  b^{52, 12}_0 ∧ -p_624) -> ( b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0)
c  in CNF:
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨  b^{52, 13}_2
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨  b^{52, 13}_1
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨  p_624 ∨ -b^{52, 13}_0
c  in DIMACS:
-17030  17031 -17032  624  17033 0
-17030  17031 -17032  624  17034 0
-17030  17031 -17032  624 -17035 0

c  -2-1 --> break 
c    ( b^{52, 12}_2 ∧  b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨  b^{52, 12}_0 ∨  p_624 ∨ break
c  in DIMACS:
-17030 -17031  17032  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 12}_2 ∧ -b^{52, 12}_1 ∧ -b^{52, 12}_0 ∧ true) 
c  in CNF:
c    -b^{52, 12}_2 ∨  b^{52, 12}_1 ∨  b^{52, 12}_0 ∨ false 
c  in DIMACS:
-17030  17031  17032  0

c  3 does not represent an automaton state.
c    -(-b^{52, 12}_2 ∧  b^{52, 12}_1 ∧  b^{52, 12}_0 ∧ true) 
c  in CNF:
c     b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ false 
c  in DIMACS:
 17030 -17031 -17032  0
c  -3 does not represent an automaton state.
c    -( b^{52, 12}_2 ∧  b^{52, 12}_1 ∧  b^{52, 12}_0 ∧ true) 
c  in CNF:
c    -b^{52, 12}_2 ∨ -b^{52, 12}_1 ∨ -b^{52, 12}_0 ∨ false 
c  in DIMACS:
-17030 -17031 -17032  0

c i = 13
c  -2+1 --> -1
c    ( b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧  p_676) -> ( b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0)
c  in CNF:
c    -b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨  b^{52, 14}_2
c    -b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_1
c    -b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨  b^{52, 14}_0
c  in DIMACS:
-17033 -17034  17035 -676  17036 0
-17033 -17034  17035 -676 -17037 0
-17033 -17034  17035 -676  17038 0

c  -1+1 --> 0
c    ( b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0 ∧  p_676) -> (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧ -b^{52, 14}_0)
c  in CNF:
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_2
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_1
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_0
c  in DIMACS:
-17033  17034 -17035 -676 -17036 0
-17033  17034 -17035 -676 -17037 0
-17033  17034 -17035 -676 -17038 0

c  0+1 --> 1
c    (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧  p_676) -> (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0)
c  in CNF:
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_2
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_1
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨  b^{52, 14}_0
c  in DIMACS:
 17033  17034  17035 -676 -17036 0
 17033  17034  17035 -676 -17037 0
 17033  17034  17035 -676  17038 0

c  1+1 --> 2
c    (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0 ∧  p_676) -> (-b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0)
c  in CNF:
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_2
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨  b^{52, 14}_1
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ -p_676 ∨ -b^{52, 14}_0
c  in DIMACS:
 17033  17034 -17035 -676 -17036 0
 17033  17034 -17035 -676  17037 0
 17033  17034 -17035 -676 -17038 0

c  2+1 --> break 
c    (-b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧  p_676) -> break
c  in CNF:
c     b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 17033 -17034  17035 -676 1162 0


c  2-1 --> 1
c    (-b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧ -p_676) -> (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0)
c  in CNF:
c     b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_2
c     b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_1
c     b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨  b^{52, 14}_0
c  in DIMACS:
 17033 -17034  17035  676 -17036 0
 17033 -17034  17035  676 -17037 0
 17033 -17034  17035  676  17038 0

c  1-1 --> 0
c    (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0 ∧ -p_676) -> (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧ -b^{52, 14}_0)
c  in CNF:
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_2
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_1
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_0
c  in DIMACS:
 17033  17034 -17035  676 -17036 0
 17033  17034 -17035  676 -17037 0
 17033  17034 -17035  676 -17038 0

c  0-1 --> -1
c    (-b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧ -p_676) -> ( b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0)
c  in CNF:
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨  b^{52, 14}_2
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_1
c     b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨  b^{52, 14}_0
c  in DIMACS:
 17033  17034  17035  676  17036 0
 17033  17034  17035  676 -17037 0
 17033  17034  17035  676  17038 0

c  -1-1 --> -2
c    ( b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧  b^{52, 13}_0 ∧ -p_676) -> ( b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0)
c  in CNF:
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨  b^{52, 14}_2
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨  b^{52, 14}_1
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨  p_676 ∨ -b^{52, 14}_0
c  in DIMACS:
-17033  17034 -17035  676  17036 0
-17033  17034 -17035  676  17037 0
-17033  17034 -17035  676 -17038 0

c  -2-1 --> break 
c    ( b^{52, 13}_2 ∧  b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨  b^{52, 13}_0 ∨  p_676 ∨ break
c  in DIMACS:
-17033 -17034  17035  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 13}_2 ∧ -b^{52, 13}_1 ∧ -b^{52, 13}_0 ∧ true) 
c  in CNF:
c    -b^{52, 13}_2 ∨  b^{52, 13}_1 ∨  b^{52, 13}_0 ∨ false 
c  in DIMACS:
-17033  17034  17035  0

c  3 does not represent an automaton state.
c    -(-b^{52, 13}_2 ∧  b^{52, 13}_1 ∧  b^{52, 13}_0 ∧ true) 
c  in CNF:
c     b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ false 
c  in DIMACS:
 17033 -17034 -17035  0
c  -3 does not represent an automaton state.
c    -( b^{52, 13}_2 ∧  b^{52, 13}_1 ∧  b^{52, 13}_0 ∧ true) 
c  in CNF:
c    -b^{52, 13}_2 ∨ -b^{52, 13}_1 ∨ -b^{52, 13}_0 ∨ false 
c  in DIMACS:
-17033 -17034 -17035  0

c i = 14
c  -2+1 --> -1
c    ( b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧  p_728) -> ( b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0)
c  in CNF:
c    -b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨  b^{52, 15}_2
c    -b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_1
c    -b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨  b^{52, 15}_0
c  in DIMACS:
-17036 -17037  17038 -728  17039 0
-17036 -17037  17038 -728 -17040 0
-17036 -17037  17038 -728  17041 0

c  -1+1 --> 0
c    ( b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0 ∧  p_728) -> (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧ -b^{52, 15}_0)
c  in CNF:
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_2
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_1
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_0
c  in DIMACS:
-17036  17037 -17038 -728 -17039 0
-17036  17037 -17038 -728 -17040 0
-17036  17037 -17038 -728 -17041 0

c  0+1 --> 1
c    (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧  p_728) -> (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0)
c  in CNF:
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_2
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_1
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨  b^{52, 15}_0
c  in DIMACS:
 17036  17037  17038 -728 -17039 0
 17036  17037  17038 -728 -17040 0
 17036  17037  17038 -728  17041 0

c  1+1 --> 2
c    (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0 ∧  p_728) -> (-b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0)
c  in CNF:
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_2
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨  b^{52, 15}_1
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ -p_728 ∨ -b^{52, 15}_0
c  in DIMACS:
 17036  17037 -17038 -728 -17039 0
 17036  17037 -17038 -728  17040 0
 17036  17037 -17038 -728 -17041 0

c  2+1 --> break 
c    (-b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧  p_728) -> break
c  in CNF:
c     b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 17036 -17037  17038 -728 1162 0


c  2-1 --> 1
c    (-b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧ -p_728) -> (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0)
c  in CNF:
c     b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_2
c     b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_1
c     b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨  b^{52, 15}_0
c  in DIMACS:
 17036 -17037  17038  728 -17039 0
 17036 -17037  17038  728 -17040 0
 17036 -17037  17038  728  17041 0

c  1-1 --> 0
c    (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0 ∧ -p_728) -> (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧ -b^{52, 15}_0)
c  in CNF:
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_2
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_1
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_0
c  in DIMACS:
 17036  17037 -17038  728 -17039 0
 17036  17037 -17038  728 -17040 0
 17036  17037 -17038  728 -17041 0

c  0-1 --> -1
c    (-b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧ -p_728) -> ( b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0)
c  in CNF:
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨  b^{52, 15}_2
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_1
c     b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨  b^{52, 15}_0
c  in DIMACS:
 17036  17037  17038  728  17039 0
 17036  17037  17038  728 -17040 0
 17036  17037  17038  728  17041 0

c  -1-1 --> -2
c    ( b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧  b^{52, 14}_0 ∧ -p_728) -> ( b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0)
c  in CNF:
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨  b^{52, 15}_2
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨  b^{52, 15}_1
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨  p_728 ∨ -b^{52, 15}_0
c  in DIMACS:
-17036  17037 -17038  728  17039 0
-17036  17037 -17038  728  17040 0
-17036  17037 -17038  728 -17041 0

c  -2-1 --> break 
c    ( b^{52, 14}_2 ∧  b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨  b^{52, 14}_0 ∨  p_728 ∨ break
c  in DIMACS:
-17036 -17037  17038  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 14}_2 ∧ -b^{52, 14}_1 ∧ -b^{52, 14}_0 ∧ true) 
c  in CNF:
c    -b^{52, 14}_2 ∨  b^{52, 14}_1 ∨  b^{52, 14}_0 ∨ false 
c  in DIMACS:
-17036  17037  17038  0

c  3 does not represent an automaton state.
c    -(-b^{52, 14}_2 ∧  b^{52, 14}_1 ∧  b^{52, 14}_0 ∧ true) 
c  in CNF:
c     b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ false 
c  in DIMACS:
 17036 -17037 -17038  0
c  -3 does not represent an automaton state.
c    -( b^{52, 14}_2 ∧  b^{52, 14}_1 ∧  b^{52, 14}_0 ∧ true) 
c  in CNF:
c    -b^{52, 14}_2 ∨ -b^{52, 14}_1 ∨ -b^{52, 14}_0 ∨ false 
c  in DIMACS:
-17036 -17037 -17038  0

c i = 15
c  -2+1 --> -1
c    ( b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧  p_780) -> ( b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0)
c  in CNF:
c    -b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨  b^{52, 16}_2
c    -b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_1
c    -b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨  b^{52, 16}_0
c  in DIMACS:
-17039 -17040  17041 -780  17042 0
-17039 -17040  17041 -780 -17043 0
-17039 -17040  17041 -780  17044 0

c  -1+1 --> 0
c    ( b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0 ∧  p_780) -> (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧ -b^{52, 16}_0)
c  in CNF:
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_2
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_1
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_0
c  in DIMACS:
-17039  17040 -17041 -780 -17042 0
-17039  17040 -17041 -780 -17043 0
-17039  17040 -17041 -780 -17044 0

c  0+1 --> 1
c    (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧  p_780) -> (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0)
c  in CNF:
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_2
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_1
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨  b^{52, 16}_0
c  in DIMACS:
 17039  17040  17041 -780 -17042 0
 17039  17040  17041 -780 -17043 0
 17039  17040  17041 -780  17044 0

c  1+1 --> 2
c    (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0 ∧  p_780) -> (-b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0)
c  in CNF:
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_2
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨  b^{52, 16}_1
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ -p_780 ∨ -b^{52, 16}_0
c  in DIMACS:
 17039  17040 -17041 -780 -17042 0
 17039  17040 -17041 -780  17043 0
 17039  17040 -17041 -780 -17044 0

c  2+1 --> break 
c    (-b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧  p_780) -> break
c  in CNF:
c     b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 17039 -17040  17041 -780 1162 0


c  2-1 --> 1
c    (-b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧ -p_780) -> (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0)
c  in CNF:
c     b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_2
c     b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_1
c     b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨  b^{52, 16}_0
c  in DIMACS:
 17039 -17040  17041  780 -17042 0
 17039 -17040  17041  780 -17043 0
 17039 -17040  17041  780  17044 0

c  1-1 --> 0
c    (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0 ∧ -p_780) -> (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧ -b^{52, 16}_0)
c  in CNF:
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_2
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_1
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_0
c  in DIMACS:
 17039  17040 -17041  780 -17042 0
 17039  17040 -17041  780 -17043 0
 17039  17040 -17041  780 -17044 0

c  0-1 --> -1
c    (-b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧ -p_780) -> ( b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0)
c  in CNF:
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨  b^{52, 16}_2
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_1
c     b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨  b^{52, 16}_0
c  in DIMACS:
 17039  17040  17041  780  17042 0
 17039  17040  17041  780 -17043 0
 17039  17040  17041  780  17044 0

c  -1-1 --> -2
c    ( b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧  b^{52, 15}_0 ∧ -p_780) -> ( b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0)
c  in CNF:
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨  b^{52, 16}_2
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨  b^{52, 16}_1
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨  p_780 ∨ -b^{52, 16}_0
c  in DIMACS:
-17039  17040 -17041  780  17042 0
-17039  17040 -17041  780  17043 0
-17039  17040 -17041  780 -17044 0

c  -2-1 --> break 
c    ( b^{52, 15}_2 ∧  b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨  b^{52, 15}_0 ∨  p_780 ∨ break
c  in DIMACS:
-17039 -17040  17041  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 15}_2 ∧ -b^{52, 15}_1 ∧ -b^{52, 15}_0 ∧ true) 
c  in CNF:
c    -b^{52, 15}_2 ∨  b^{52, 15}_1 ∨  b^{52, 15}_0 ∨ false 
c  in DIMACS:
-17039  17040  17041  0

c  3 does not represent an automaton state.
c    -(-b^{52, 15}_2 ∧  b^{52, 15}_1 ∧  b^{52, 15}_0 ∧ true) 
c  in CNF:
c     b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ false 
c  in DIMACS:
 17039 -17040 -17041  0
c  -3 does not represent an automaton state.
c    -( b^{52, 15}_2 ∧  b^{52, 15}_1 ∧  b^{52, 15}_0 ∧ true) 
c  in CNF:
c    -b^{52, 15}_2 ∨ -b^{52, 15}_1 ∨ -b^{52, 15}_0 ∨ false 
c  in DIMACS:
-17039 -17040 -17041  0

c i = 16
c  -2+1 --> -1
c    ( b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧  p_832) -> ( b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0)
c  in CNF:
c    -b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨  b^{52, 17}_2
c    -b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_1
c    -b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨  b^{52, 17}_0
c  in DIMACS:
-17042 -17043  17044 -832  17045 0
-17042 -17043  17044 -832 -17046 0
-17042 -17043  17044 -832  17047 0

c  -1+1 --> 0
c    ( b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0 ∧  p_832) -> (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧ -b^{52, 17}_0)
c  in CNF:
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_2
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_1
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_0
c  in DIMACS:
-17042  17043 -17044 -832 -17045 0
-17042  17043 -17044 -832 -17046 0
-17042  17043 -17044 -832 -17047 0

c  0+1 --> 1
c    (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧  p_832) -> (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0)
c  in CNF:
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_2
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_1
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨  b^{52, 17}_0
c  in DIMACS:
 17042  17043  17044 -832 -17045 0
 17042  17043  17044 -832 -17046 0
 17042  17043  17044 -832  17047 0

c  1+1 --> 2
c    (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0 ∧  p_832) -> (-b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0)
c  in CNF:
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_2
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨  b^{52, 17}_1
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ -p_832 ∨ -b^{52, 17}_0
c  in DIMACS:
 17042  17043 -17044 -832 -17045 0
 17042  17043 -17044 -832  17046 0
 17042  17043 -17044 -832 -17047 0

c  2+1 --> break 
c    (-b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧  p_832) -> break
c  in CNF:
c     b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 17042 -17043  17044 -832 1162 0


c  2-1 --> 1
c    (-b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧ -p_832) -> (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0)
c  in CNF:
c     b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_2
c     b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_1
c     b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨  b^{52, 17}_0
c  in DIMACS:
 17042 -17043  17044  832 -17045 0
 17042 -17043  17044  832 -17046 0
 17042 -17043  17044  832  17047 0

c  1-1 --> 0
c    (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0 ∧ -p_832) -> (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧ -b^{52, 17}_0)
c  in CNF:
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_2
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_1
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_0
c  in DIMACS:
 17042  17043 -17044  832 -17045 0
 17042  17043 -17044  832 -17046 0
 17042  17043 -17044  832 -17047 0

c  0-1 --> -1
c    (-b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧ -p_832) -> ( b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0)
c  in CNF:
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨  b^{52, 17}_2
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_1
c     b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨  b^{52, 17}_0
c  in DIMACS:
 17042  17043  17044  832  17045 0
 17042  17043  17044  832 -17046 0
 17042  17043  17044  832  17047 0

c  -1-1 --> -2
c    ( b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧  b^{52, 16}_0 ∧ -p_832) -> ( b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0)
c  in CNF:
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨  b^{52, 17}_2
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨  b^{52, 17}_1
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨  p_832 ∨ -b^{52, 17}_0
c  in DIMACS:
-17042  17043 -17044  832  17045 0
-17042  17043 -17044  832  17046 0
-17042  17043 -17044  832 -17047 0

c  -2-1 --> break 
c    ( b^{52, 16}_2 ∧  b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨  b^{52, 16}_0 ∨  p_832 ∨ break
c  in DIMACS:
-17042 -17043  17044  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 16}_2 ∧ -b^{52, 16}_1 ∧ -b^{52, 16}_0 ∧ true) 
c  in CNF:
c    -b^{52, 16}_2 ∨  b^{52, 16}_1 ∨  b^{52, 16}_0 ∨ false 
c  in DIMACS:
-17042  17043  17044  0

c  3 does not represent an automaton state.
c    -(-b^{52, 16}_2 ∧  b^{52, 16}_1 ∧  b^{52, 16}_0 ∧ true) 
c  in CNF:
c     b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ false 
c  in DIMACS:
 17042 -17043 -17044  0
c  -3 does not represent an automaton state.
c    -( b^{52, 16}_2 ∧  b^{52, 16}_1 ∧  b^{52, 16}_0 ∧ true) 
c  in CNF:
c    -b^{52, 16}_2 ∨ -b^{52, 16}_1 ∨ -b^{52, 16}_0 ∨ false 
c  in DIMACS:
-17042 -17043 -17044  0

c i = 17
c  -2+1 --> -1
c    ( b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧  p_884) -> ( b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0)
c  in CNF:
c    -b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨  b^{52, 18}_2
c    -b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_1
c    -b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨  b^{52, 18}_0
c  in DIMACS:
-17045 -17046  17047 -884  17048 0
-17045 -17046  17047 -884 -17049 0
-17045 -17046  17047 -884  17050 0

c  -1+1 --> 0
c    ( b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0 ∧  p_884) -> (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧ -b^{52, 18}_0)
c  in CNF:
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_2
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_1
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_0
c  in DIMACS:
-17045  17046 -17047 -884 -17048 0
-17045  17046 -17047 -884 -17049 0
-17045  17046 -17047 -884 -17050 0

c  0+1 --> 1
c    (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧  p_884) -> (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0)
c  in CNF:
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_2
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_1
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨  b^{52, 18}_0
c  in DIMACS:
 17045  17046  17047 -884 -17048 0
 17045  17046  17047 -884 -17049 0
 17045  17046  17047 -884  17050 0

c  1+1 --> 2
c    (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0 ∧  p_884) -> (-b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0)
c  in CNF:
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_2
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨  b^{52, 18}_1
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ -p_884 ∨ -b^{52, 18}_0
c  in DIMACS:
 17045  17046 -17047 -884 -17048 0
 17045  17046 -17047 -884  17049 0
 17045  17046 -17047 -884 -17050 0

c  2+1 --> break 
c    (-b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧  p_884) -> break
c  in CNF:
c     b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 17045 -17046  17047 -884 1162 0


c  2-1 --> 1
c    (-b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧ -p_884) -> (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0)
c  in CNF:
c     b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_2
c     b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_1
c     b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨  b^{52, 18}_0
c  in DIMACS:
 17045 -17046  17047  884 -17048 0
 17045 -17046  17047  884 -17049 0
 17045 -17046  17047  884  17050 0

c  1-1 --> 0
c    (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0 ∧ -p_884) -> (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧ -b^{52, 18}_0)
c  in CNF:
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_2
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_1
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_0
c  in DIMACS:
 17045  17046 -17047  884 -17048 0
 17045  17046 -17047  884 -17049 0
 17045  17046 -17047  884 -17050 0

c  0-1 --> -1
c    (-b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧ -p_884) -> ( b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0)
c  in CNF:
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨  b^{52, 18}_2
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_1
c     b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨  b^{52, 18}_0
c  in DIMACS:
 17045  17046  17047  884  17048 0
 17045  17046  17047  884 -17049 0
 17045  17046  17047  884  17050 0

c  -1-1 --> -2
c    ( b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧  b^{52, 17}_0 ∧ -p_884) -> ( b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0)
c  in CNF:
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨  b^{52, 18}_2
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨  b^{52, 18}_1
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨  p_884 ∨ -b^{52, 18}_0
c  in DIMACS:
-17045  17046 -17047  884  17048 0
-17045  17046 -17047  884  17049 0
-17045  17046 -17047  884 -17050 0

c  -2-1 --> break 
c    ( b^{52, 17}_2 ∧  b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨  b^{52, 17}_0 ∨  p_884 ∨ break
c  in DIMACS:
-17045 -17046  17047  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 17}_2 ∧ -b^{52, 17}_1 ∧ -b^{52, 17}_0 ∧ true) 
c  in CNF:
c    -b^{52, 17}_2 ∨  b^{52, 17}_1 ∨  b^{52, 17}_0 ∨ false 
c  in DIMACS:
-17045  17046  17047  0

c  3 does not represent an automaton state.
c    -(-b^{52, 17}_2 ∧  b^{52, 17}_1 ∧  b^{52, 17}_0 ∧ true) 
c  in CNF:
c     b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ false 
c  in DIMACS:
 17045 -17046 -17047  0
c  -3 does not represent an automaton state.
c    -( b^{52, 17}_2 ∧  b^{52, 17}_1 ∧  b^{52, 17}_0 ∧ true) 
c  in CNF:
c    -b^{52, 17}_2 ∨ -b^{52, 17}_1 ∨ -b^{52, 17}_0 ∨ false 
c  in DIMACS:
-17045 -17046 -17047  0

c i = 18
c  -2+1 --> -1
c    ( b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧  p_936) -> ( b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0)
c  in CNF:
c    -b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨  b^{52, 19}_2
c    -b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_1
c    -b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨  b^{52, 19}_0
c  in DIMACS:
-17048 -17049  17050 -936  17051 0
-17048 -17049  17050 -936 -17052 0
-17048 -17049  17050 -936  17053 0

c  -1+1 --> 0
c    ( b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0 ∧  p_936) -> (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧ -b^{52, 19}_0)
c  in CNF:
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_2
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_1
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_0
c  in DIMACS:
-17048  17049 -17050 -936 -17051 0
-17048  17049 -17050 -936 -17052 0
-17048  17049 -17050 -936 -17053 0

c  0+1 --> 1
c    (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧  p_936) -> (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0)
c  in CNF:
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_2
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_1
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨  b^{52, 19}_0
c  in DIMACS:
 17048  17049  17050 -936 -17051 0
 17048  17049  17050 -936 -17052 0
 17048  17049  17050 -936  17053 0

c  1+1 --> 2
c    (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0 ∧  p_936) -> (-b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0)
c  in CNF:
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_2
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨  b^{52, 19}_1
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ -p_936 ∨ -b^{52, 19}_0
c  in DIMACS:
 17048  17049 -17050 -936 -17051 0
 17048  17049 -17050 -936  17052 0
 17048  17049 -17050 -936 -17053 0

c  2+1 --> break 
c    (-b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧  p_936) -> break
c  in CNF:
c     b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 17048 -17049  17050 -936 1162 0


c  2-1 --> 1
c    (-b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧ -p_936) -> (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0)
c  in CNF:
c     b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_2
c     b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_1
c     b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨  b^{52, 19}_0
c  in DIMACS:
 17048 -17049  17050  936 -17051 0
 17048 -17049  17050  936 -17052 0
 17048 -17049  17050  936  17053 0

c  1-1 --> 0
c    (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0 ∧ -p_936) -> (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧ -b^{52, 19}_0)
c  in CNF:
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_2
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_1
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_0
c  in DIMACS:
 17048  17049 -17050  936 -17051 0
 17048  17049 -17050  936 -17052 0
 17048  17049 -17050  936 -17053 0

c  0-1 --> -1
c    (-b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧ -p_936) -> ( b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0)
c  in CNF:
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨  b^{52, 19}_2
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_1
c     b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨  b^{52, 19}_0
c  in DIMACS:
 17048  17049  17050  936  17051 0
 17048  17049  17050  936 -17052 0
 17048  17049  17050  936  17053 0

c  -1-1 --> -2
c    ( b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧  b^{52, 18}_0 ∧ -p_936) -> ( b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0)
c  in CNF:
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨  b^{52, 19}_2
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨  b^{52, 19}_1
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨  p_936 ∨ -b^{52, 19}_0
c  in DIMACS:
-17048  17049 -17050  936  17051 0
-17048  17049 -17050  936  17052 0
-17048  17049 -17050  936 -17053 0

c  -2-1 --> break 
c    ( b^{52, 18}_2 ∧  b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨  b^{52, 18}_0 ∨  p_936 ∨ break
c  in DIMACS:
-17048 -17049  17050  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 18}_2 ∧ -b^{52, 18}_1 ∧ -b^{52, 18}_0 ∧ true) 
c  in CNF:
c    -b^{52, 18}_2 ∨  b^{52, 18}_1 ∨  b^{52, 18}_0 ∨ false 
c  in DIMACS:
-17048  17049  17050  0

c  3 does not represent an automaton state.
c    -(-b^{52, 18}_2 ∧  b^{52, 18}_1 ∧  b^{52, 18}_0 ∧ true) 
c  in CNF:
c     b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ false 
c  in DIMACS:
 17048 -17049 -17050  0
c  -3 does not represent an automaton state.
c    -( b^{52, 18}_2 ∧  b^{52, 18}_1 ∧  b^{52, 18}_0 ∧ true) 
c  in CNF:
c    -b^{52, 18}_2 ∨ -b^{52, 18}_1 ∨ -b^{52, 18}_0 ∨ false 
c  in DIMACS:
-17048 -17049 -17050  0

c i = 19
c  -2+1 --> -1
c    ( b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧  p_988) -> ( b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0)
c  in CNF:
c    -b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨  b^{52, 20}_2
c    -b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_1
c    -b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨  b^{52, 20}_0
c  in DIMACS:
-17051 -17052  17053 -988  17054 0
-17051 -17052  17053 -988 -17055 0
-17051 -17052  17053 -988  17056 0

c  -1+1 --> 0
c    ( b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0 ∧  p_988) -> (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧ -b^{52, 20}_0)
c  in CNF:
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_2
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_1
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_0
c  in DIMACS:
-17051  17052 -17053 -988 -17054 0
-17051  17052 -17053 -988 -17055 0
-17051  17052 -17053 -988 -17056 0

c  0+1 --> 1
c    (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧  p_988) -> (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0)
c  in CNF:
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_2
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_1
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨  b^{52, 20}_0
c  in DIMACS:
 17051  17052  17053 -988 -17054 0
 17051  17052  17053 -988 -17055 0
 17051  17052  17053 -988  17056 0

c  1+1 --> 2
c    (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0 ∧  p_988) -> (-b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0)
c  in CNF:
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_2
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨  b^{52, 20}_1
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ -p_988 ∨ -b^{52, 20}_0
c  in DIMACS:
 17051  17052 -17053 -988 -17054 0
 17051  17052 -17053 -988  17055 0
 17051  17052 -17053 -988 -17056 0

c  2+1 --> break 
c    (-b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧  p_988) -> break
c  in CNF:
c     b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 17051 -17052  17053 -988 1162 0


c  2-1 --> 1
c    (-b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧ -p_988) -> (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0)
c  in CNF:
c     b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_2
c     b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_1
c     b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨  b^{52, 20}_0
c  in DIMACS:
 17051 -17052  17053  988 -17054 0
 17051 -17052  17053  988 -17055 0
 17051 -17052  17053  988  17056 0

c  1-1 --> 0
c    (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0 ∧ -p_988) -> (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧ -b^{52, 20}_0)
c  in CNF:
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_2
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_1
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_0
c  in DIMACS:
 17051  17052 -17053  988 -17054 0
 17051  17052 -17053  988 -17055 0
 17051  17052 -17053  988 -17056 0

c  0-1 --> -1
c    (-b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧ -p_988) -> ( b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0)
c  in CNF:
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨  b^{52, 20}_2
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_1
c     b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨  b^{52, 20}_0
c  in DIMACS:
 17051  17052  17053  988  17054 0
 17051  17052  17053  988 -17055 0
 17051  17052  17053  988  17056 0

c  -1-1 --> -2
c    ( b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧  b^{52, 19}_0 ∧ -p_988) -> ( b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0)
c  in CNF:
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨  b^{52, 20}_2
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨  b^{52, 20}_1
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨  p_988 ∨ -b^{52, 20}_0
c  in DIMACS:
-17051  17052 -17053  988  17054 0
-17051  17052 -17053  988  17055 0
-17051  17052 -17053  988 -17056 0

c  -2-1 --> break 
c    ( b^{52, 19}_2 ∧  b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨  b^{52, 19}_0 ∨  p_988 ∨ break
c  in DIMACS:
-17051 -17052  17053  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 19}_2 ∧ -b^{52, 19}_1 ∧ -b^{52, 19}_0 ∧ true) 
c  in CNF:
c    -b^{52, 19}_2 ∨  b^{52, 19}_1 ∨  b^{52, 19}_0 ∨ false 
c  in DIMACS:
-17051  17052  17053  0

c  3 does not represent an automaton state.
c    -(-b^{52, 19}_2 ∧  b^{52, 19}_1 ∧  b^{52, 19}_0 ∧ true) 
c  in CNF:
c     b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ false 
c  in DIMACS:
 17051 -17052 -17053  0
c  -3 does not represent an automaton state.
c    -( b^{52, 19}_2 ∧  b^{52, 19}_1 ∧  b^{52, 19}_0 ∧ true) 
c  in CNF:
c    -b^{52, 19}_2 ∨ -b^{52, 19}_1 ∨ -b^{52, 19}_0 ∨ false 
c  in DIMACS:
-17051 -17052 -17053  0

c i = 20
c  -2+1 --> -1
c    ( b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧  p_1040) -> ( b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0)
c  in CNF:
c    -b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨  b^{52, 21}_2
c    -b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_1
c    -b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨  b^{52, 21}_0
c  in DIMACS:
-17054 -17055  17056 -1040  17057 0
-17054 -17055  17056 -1040 -17058 0
-17054 -17055  17056 -1040  17059 0

c  -1+1 --> 0
c    ( b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0 ∧  p_1040) -> (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧ -b^{52, 21}_0)
c  in CNF:
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_2
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_1
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_0
c  in DIMACS:
-17054  17055 -17056 -1040 -17057 0
-17054  17055 -17056 -1040 -17058 0
-17054  17055 -17056 -1040 -17059 0

c  0+1 --> 1
c    (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧  p_1040) -> (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0)
c  in CNF:
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_2
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_1
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨  b^{52, 21}_0
c  in DIMACS:
 17054  17055  17056 -1040 -17057 0
 17054  17055  17056 -1040 -17058 0
 17054  17055  17056 -1040  17059 0

c  1+1 --> 2
c    (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0 ∧  p_1040) -> (-b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0)
c  in CNF:
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_2
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨  b^{52, 21}_1
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ -p_1040 ∨ -b^{52, 21}_0
c  in DIMACS:
 17054  17055 -17056 -1040 -17057 0
 17054  17055 -17056 -1040  17058 0
 17054  17055 -17056 -1040 -17059 0

c  2+1 --> break 
c    (-b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 17054 -17055  17056 -1040 1162 0


c  2-1 --> 1
c    (-b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧ -p_1040) -> (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0)
c  in CNF:
c     b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_2
c     b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_1
c     b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨  b^{52, 21}_0
c  in DIMACS:
 17054 -17055  17056  1040 -17057 0
 17054 -17055  17056  1040 -17058 0
 17054 -17055  17056  1040  17059 0

c  1-1 --> 0
c    (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0 ∧ -p_1040) -> (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧ -b^{52, 21}_0)
c  in CNF:
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_2
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_1
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_0
c  in DIMACS:
 17054  17055 -17056  1040 -17057 0
 17054  17055 -17056  1040 -17058 0
 17054  17055 -17056  1040 -17059 0

c  0-1 --> -1
c    (-b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧ -p_1040) -> ( b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0)
c  in CNF:
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨  b^{52, 21}_2
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_1
c     b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨  b^{52, 21}_0
c  in DIMACS:
 17054  17055  17056  1040  17057 0
 17054  17055  17056  1040 -17058 0
 17054  17055  17056  1040  17059 0

c  -1-1 --> -2
c    ( b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧  b^{52, 20}_0 ∧ -p_1040) -> ( b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0)
c  in CNF:
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨  b^{52, 21}_2
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨  b^{52, 21}_1
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨  p_1040 ∨ -b^{52, 21}_0
c  in DIMACS:
-17054  17055 -17056  1040  17057 0
-17054  17055 -17056  1040  17058 0
-17054  17055 -17056  1040 -17059 0

c  -2-1 --> break 
c    ( b^{52, 20}_2 ∧  b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨  b^{52, 20}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-17054 -17055  17056  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 20}_2 ∧ -b^{52, 20}_1 ∧ -b^{52, 20}_0 ∧ true) 
c  in CNF:
c    -b^{52, 20}_2 ∨  b^{52, 20}_1 ∨  b^{52, 20}_0 ∨ false 
c  in DIMACS:
-17054  17055  17056  0

c  3 does not represent an automaton state.
c    -(-b^{52, 20}_2 ∧  b^{52, 20}_1 ∧  b^{52, 20}_0 ∧ true) 
c  in CNF:
c     b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ false 
c  in DIMACS:
 17054 -17055 -17056  0
c  -3 does not represent an automaton state.
c    -( b^{52, 20}_2 ∧  b^{52, 20}_1 ∧  b^{52, 20}_0 ∧ true) 
c  in CNF:
c    -b^{52, 20}_2 ∨ -b^{52, 20}_1 ∨ -b^{52, 20}_0 ∨ false 
c  in DIMACS:
-17054 -17055 -17056  0

c i = 21
c  -2+1 --> -1
c    ( b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧  p_1092) -> ( b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0)
c  in CNF:
c    -b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨  b^{52, 22}_2
c    -b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_1
c    -b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨  b^{52, 22}_0
c  in DIMACS:
-17057 -17058  17059 -1092  17060 0
-17057 -17058  17059 -1092 -17061 0
-17057 -17058  17059 -1092  17062 0

c  -1+1 --> 0
c    ( b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0 ∧  p_1092) -> (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧ -b^{52, 22}_0)
c  in CNF:
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_2
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_1
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_0
c  in DIMACS:
-17057  17058 -17059 -1092 -17060 0
-17057  17058 -17059 -1092 -17061 0
-17057  17058 -17059 -1092 -17062 0

c  0+1 --> 1
c    (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧  p_1092) -> (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0)
c  in CNF:
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_2
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_1
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨  b^{52, 22}_0
c  in DIMACS:
 17057  17058  17059 -1092 -17060 0
 17057  17058  17059 -1092 -17061 0
 17057  17058  17059 -1092  17062 0

c  1+1 --> 2
c    (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0 ∧  p_1092) -> (-b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0)
c  in CNF:
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_2
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨  b^{52, 22}_1
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ -p_1092 ∨ -b^{52, 22}_0
c  in DIMACS:
 17057  17058 -17059 -1092 -17060 0
 17057  17058 -17059 -1092  17061 0
 17057  17058 -17059 -1092 -17062 0

c  2+1 --> break 
c    (-b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 17057 -17058  17059 -1092 1162 0


c  2-1 --> 1
c    (-b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧ -p_1092) -> (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0)
c  in CNF:
c     b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_2
c     b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_1
c     b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨  b^{52, 22}_0
c  in DIMACS:
 17057 -17058  17059  1092 -17060 0
 17057 -17058  17059  1092 -17061 0
 17057 -17058  17059  1092  17062 0

c  1-1 --> 0
c    (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0 ∧ -p_1092) -> (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧ -b^{52, 22}_0)
c  in CNF:
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_2
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_1
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_0
c  in DIMACS:
 17057  17058 -17059  1092 -17060 0
 17057  17058 -17059  1092 -17061 0
 17057  17058 -17059  1092 -17062 0

c  0-1 --> -1
c    (-b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧ -p_1092) -> ( b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0)
c  in CNF:
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨  b^{52, 22}_2
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_1
c     b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨  b^{52, 22}_0
c  in DIMACS:
 17057  17058  17059  1092  17060 0
 17057  17058  17059  1092 -17061 0
 17057  17058  17059  1092  17062 0

c  -1-1 --> -2
c    ( b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧  b^{52, 21}_0 ∧ -p_1092) -> ( b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0)
c  in CNF:
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨  b^{52, 22}_2
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨  b^{52, 22}_1
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨  p_1092 ∨ -b^{52, 22}_0
c  in DIMACS:
-17057  17058 -17059  1092  17060 0
-17057  17058 -17059  1092  17061 0
-17057  17058 -17059  1092 -17062 0

c  -2-1 --> break 
c    ( b^{52, 21}_2 ∧  b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨  b^{52, 21}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-17057 -17058  17059  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 21}_2 ∧ -b^{52, 21}_1 ∧ -b^{52, 21}_0 ∧ true) 
c  in CNF:
c    -b^{52, 21}_2 ∨  b^{52, 21}_1 ∨  b^{52, 21}_0 ∨ false 
c  in DIMACS:
-17057  17058  17059  0

c  3 does not represent an automaton state.
c    -(-b^{52, 21}_2 ∧  b^{52, 21}_1 ∧  b^{52, 21}_0 ∧ true) 
c  in CNF:
c     b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ false 
c  in DIMACS:
 17057 -17058 -17059  0
c  -3 does not represent an automaton state.
c    -( b^{52, 21}_2 ∧  b^{52, 21}_1 ∧  b^{52, 21}_0 ∧ true) 
c  in CNF:
c    -b^{52, 21}_2 ∨ -b^{52, 21}_1 ∨ -b^{52, 21}_0 ∨ false 
c  in DIMACS:
-17057 -17058 -17059  0

c i = 22
c  -2+1 --> -1
c    ( b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧  p_1144) -> ( b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧  b^{52, 23}_0)
c  in CNF:
c    -b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨  b^{52, 23}_2
c    -b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_1
c    -b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨  b^{52, 23}_0
c  in DIMACS:
-17060 -17061  17062 -1144  17063 0
-17060 -17061  17062 -1144 -17064 0
-17060 -17061  17062 -1144  17065 0

c  -1+1 --> 0
c    ( b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0 ∧  p_1144) -> (-b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧ -b^{52, 23}_0)
c  in CNF:
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_2
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_1
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_0
c  in DIMACS:
-17060  17061 -17062 -1144 -17063 0
-17060  17061 -17062 -1144 -17064 0
-17060  17061 -17062 -1144 -17065 0

c  0+1 --> 1
c    (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧  p_1144) -> (-b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧  b^{52, 23}_0)
c  in CNF:
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_2
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_1
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨  b^{52, 23}_0
c  in DIMACS:
 17060  17061  17062 -1144 -17063 0
 17060  17061  17062 -1144 -17064 0
 17060  17061  17062 -1144  17065 0

c  1+1 --> 2
c    (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0 ∧  p_1144) -> (-b^{52, 23}_2 ∧  b^{52, 23}_1 ∧ -b^{52, 23}_0)
c  in CNF:
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_2
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨  b^{52, 23}_1
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ -p_1144 ∨ -b^{52, 23}_0
c  in DIMACS:
 17060  17061 -17062 -1144 -17063 0
 17060  17061 -17062 -1144  17064 0
 17060  17061 -17062 -1144 -17065 0

c  2+1 --> break 
c    (-b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 17060 -17061  17062 -1144 1162 0


c  2-1 --> 1
c    (-b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧ -p_1144) -> (-b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧  b^{52, 23}_0)
c  in CNF:
c     b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_2
c     b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_1
c     b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨  b^{52, 23}_0
c  in DIMACS:
 17060 -17061  17062  1144 -17063 0
 17060 -17061  17062  1144 -17064 0
 17060 -17061  17062  1144  17065 0

c  1-1 --> 0
c    (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0 ∧ -p_1144) -> (-b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧ -b^{52, 23}_0)
c  in CNF:
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_2
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_1
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_0
c  in DIMACS:
 17060  17061 -17062  1144 -17063 0
 17060  17061 -17062  1144 -17064 0
 17060  17061 -17062  1144 -17065 0

c  0-1 --> -1
c    (-b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧ -p_1144) -> ( b^{52, 23}_2 ∧ -b^{52, 23}_1 ∧  b^{52, 23}_0)
c  in CNF:
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨  b^{52, 23}_2
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_1
c     b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨  b^{52, 23}_0
c  in DIMACS:
 17060  17061  17062  1144  17063 0
 17060  17061  17062  1144 -17064 0
 17060  17061  17062  1144  17065 0

c  -1-1 --> -2
c    ( b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧  b^{52, 22}_0 ∧ -p_1144) -> ( b^{52, 23}_2 ∧  b^{52, 23}_1 ∧ -b^{52, 23}_0)
c  in CNF:
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨  b^{52, 23}_2
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨  b^{52, 23}_1
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨  p_1144 ∨ -b^{52, 23}_0
c  in DIMACS:
-17060  17061 -17062  1144  17063 0
-17060  17061 -17062  1144  17064 0
-17060  17061 -17062  1144 -17065 0

c  -2-1 --> break 
c    ( b^{52, 22}_2 ∧  b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨  b^{52, 22}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-17060 -17061  17062  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{52, 22}_2 ∧ -b^{52, 22}_1 ∧ -b^{52, 22}_0 ∧ true) 
c  in CNF:
c    -b^{52, 22}_2 ∨  b^{52, 22}_1 ∨  b^{52, 22}_0 ∨ false 
c  in DIMACS:
-17060  17061  17062  0

c  3 does not represent an automaton state.
c    -(-b^{52, 22}_2 ∧  b^{52, 22}_1 ∧  b^{52, 22}_0 ∧ true) 
c  in CNF:
c     b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ false 
c  in DIMACS:
 17060 -17061 -17062  0
c  -3 does not represent an automaton state.
c    -( b^{52, 22}_2 ∧  b^{52, 22}_1 ∧  b^{52, 22}_0 ∧ true) 
c  in CNF:
c    -b^{52, 22}_2 ∨ -b^{52, 22}_1 ∨ -b^{52, 22}_0 ∨ false 
c  in DIMACS:
-17060 -17061 -17062  0

c INIT for k = 53
c    -b^{53, 1}_2
c    -b^{53, 1}_1
c    -b^{53, 1}_0
c  in DIMACS:
-17066 0
-17067 0
-17068 0

c Transitions for k = 53
c i = 1
c  -2+1 --> -1
c    ( b^{53, 1}_2 ∧  b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧  p_53) -> ( b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0)
c  in CNF:
c    -b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨  b^{53, 2}_2
c    -b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_1
c    -b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨  b^{53, 2}_0
c  in DIMACS:
-17066 -17067  17068 -53  17069 0
-17066 -17067  17068 -53 -17070 0
-17066 -17067  17068 -53  17071 0

c  -1+1 --> 0
c    ( b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧  b^{53, 1}_0 ∧  p_53) -> (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧ -b^{53, 2}_0)
c  in CNF:
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_2
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_1
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_0
c  in DIMACS:
-17066  17067 -17068 -53 -17069 0
-17066  17067 -17068 -53 -17070 0
-17066  17067 -17068 -53 -17071 0

c  0+1 --> 1
c    (-b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧  p_53) -> (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0)
c  in CNF:
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_2
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_1
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨  b^{53, 2}_0
c  in DIMACS:
 17066  17067  17068 -53 -17069 0
 17066  17067  17068 -53 -17070 0
 17066  17067  17068 -53  17071 0

c  1+1 --> 2
c    (-b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧  b^{53, 1}_0 ∧  p_53) -> (-b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0)
c  in CNF:
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_2
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨  b^{53, 2}_1
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ -p_53 ∨ -b^{53, 2}_0
c  in DIMACS:
 17066  17067 -17068 -53 -17069 0
 17066  17067 -17068 -53  17070 0
 17066  17067 -17068 -53 -17071 0

c  2+1 --> break 
c    (-b^{53, 1}_2 ∧  b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧  p_53) -> break
c  in CNF:
c     b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ -p_53 ∨ break
c  in DIMACS:
 17066 -17067  17068 -53 1162 0


c  2-1 --> 1
c    (-b^{53, 1}_2 ∧  b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧ -p_53) -> (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0)
c  in CNF:
c     b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_2
c     b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_1
c     b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨  b^{53, 2}_0
c  in DIMACS:
 17066 -17067  17068  53 -17069 0
 17066 -17067  17068  53 -17070 0
 17066 -17067  17068  53  17071 0

c  1-1 --> 0
c    (-b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧  b^{53, 1}_0 ∧ -p_53) -> (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧ -b^{53, 2}_0)
c  in CNF:
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_2
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_1
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_0
c  in DIMACS:
 17066  17067 -17068  53 -17069 0
 17066  17067 -17068  53 -17070 0
 17066  17067 -17068  53 -17071 0

c  0-1 --> -1
c    (-b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧ -p_53) -> ( b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0)
c  in CNF:
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨  b^{53, 2}_2
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_1
c     b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨  b^{53, 2}_0
c  in DIMACS:
 17066  17067  17068  53  17069 0
 17066  17067  17068  53 -17070 0
 17066  17067  17068  53  17071 0

c  -1-1 --> -2
c    ( b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧  b^{53, 1}_0 ∧ -p_53) -> ( b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0)
c  in CNF:
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨  b^{53, 2}_2
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨  b^{53, 2}_1
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨  p_53 ∨ -b^{53, 2}_0
c  in DIMACS:
-17066  17067 -17068  53  17069 0
-17066  17067 -17068  53  17070 0
-17066  17067 -17068  53 -17071 0

c  -2-1 --> break 
c    ( b^{53, 1}_2 ∧  b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧ -p_53) -> break
c  in CNF:
c    -b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨  b^{53, 1}_0 ∨  p_53 ∨ break
c  in DIMACS:
-17066 -17067  17068  53 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 1}_2 ∧ -b^{53, 1}_1 ∧ -b^{53, 1}_0 ∧ true) 
c  in CNF:
c    -b^{53, 1}_2 ∨  b^{53, 1}_1 ∨  b^{53, 1}_0 ∨ false 
c  in DIMACS:
-17066  17067  17068  0

c  3 does not represent an automaton state.
c    -(-b^{53, 1}_2 ∧  b^{53, 1}_1 ∧  b^{53, 1}_0 ∧ true) 
c  in CNF:
c     b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ false 
c  in DIMACS:
 17066 -17067 -17068  0
c  -3 does not represent an automaton state.
c    -( b^{53, 1}_2 ∧  b^{53, 1}_1 ∧  b^{53, 1}_0 ∧ true) 
c  in CNF:
c    -b^{53, 1}_2 ∨ -b^{53, 1}_1 ∨ -b^{53, 1}_0 ∨ false 
c  in DIMACS:
-17066 -17067 -17068  0

c i = 2
c  -2+1 --> -1
c    ( b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧  p_106) -> ( b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0)
c  in CNF:
c    -b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨  b^{53, 3}_2
c    -b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_1
c    -b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨  b^{53, 3}_0
c  in DIMACS:
-17069 -17070  17071 -106  17072 0
-17069 -17070  17071 -106 -17073 0
-17069 -17070  17071 -106  17074 0

c  -1+1 --> 0
c    ( b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0 ∧  p_106) -> (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧ -b^{53, 3}_0)
c  in CNF:
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_2
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_1
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_0
c  in DIMACS:
-17069  17070 -17071 -106 -17072 0
-17069  17070 -17071 -106 -17073 0
-17069  17070 -17071 -106 -17074 0

c  0+1 --> 1
c    (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧  p_106) -> (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0)
c  in CNF:
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_2
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_1
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨  b^{53, 3}_0
c  in DIMACS:
 17069  17070  17071 -106 -17072 0
 17069  17070  17071 -106 -17073 0
 17069  17070  17071 -106  17074 0

c  1+1 --> 2
c    (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0 ∧  p_106) -> (-b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0)
c  in CNF:
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_2
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨  b^{53, 3}_1
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ -p_106 ∨ -b^{53, 3}_0
c  in DIMACS:
 17069  17070 -17071 -106 -17072 0
 17069  17070 -17071 -106  17073 0
 17069  17070 -17071 -106 -17074 0

c  2+1 --> break 
c    (-b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧  p_106) -> break
c  in CNF:
c     b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ -p_106 ∨ break
c  in DIMACS:
 17069 -17070  17071 -106 1162 0


c  2-1 --> 1
c    (-b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧ -p_106) -> (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0)
c  in CNF:
c     b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_2
c     b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_1
c     b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨  b^{53, 3}_0
c  in DIMACS:
 17069 -17070  17071  106 -17072 0
 17069 -17070  17071  106 -17073 0
 17069 -17070  17071  106  17074 0

c  1-1 --> 0
c    (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0 ∧ -p_106) -> (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧ -b^{53, 3}_0)
c  in CNF:
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_2
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_1
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_0
c  in DIMACS:
 17069  17070 -17071  106 -17072 0
 17069  17070 -17071  106 -17073 0
 17069  17070 -17071  106 -17074 0

c  0-1 --> -1
c    (-b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧ -p_106) -> ( b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0)
c  in CNF:
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨  b^{53, 3}_2
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_1
c     b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨  b^{53, 3}_0
c  in DIMACS:
 17069  17070  17071  106  17072 0
 17069  17070  17071  106 -17073 0
 17069  17070  17071  106  17074 0

c  -1-1 --> -2
c    ( b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧  b^{53, 2}_0 ∧ -p_106) -> ( b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0)
c  in CNF:
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨  b^{53, 3}_2
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨  b^{53, 3}_1
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨  p_106 ∨ -b^{53, 3}_0
c  in DIMACS:
-17069  17070 -17071  106  17072 0
-17069  17070 -17071  106  17073 0
-17069  17070 -17071  106 -17074 0

c  -2-1 --> break 
c    ( b^{53, 2}_2 ∧  b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧ -p_106) -> break
c  in CNF:
c    -b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨  b^{53, 2}_0 ∨  p_106 ∨ break
c  in DIMACS:
-17069 -17070  17071  106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 2}_2 ∧ -b^{53, 2}_1 ∧ -b^{53, 2}_0 ∧ true) 
c  in CNF:
c    -b^{53, 2}_2 ∨  b^{53, 2}_1 ∨  b^{53, 2}_0 ∨ false 
c  in DIMACS:
-17069  17070  17071  0

c  3 does not represent an automaton state.
c    -(-b^{53, 2}_2 ∧  b^{53, 2}_1 ∧  b^{53, 2}_0 ∧ true) 
c  in CNF:
c     b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ false 
c  in DIMACS:
 17069 -17070 -17071  0
c  -3 does not represent an automaton state.
c    -( b^{53, 2}_2 ∧  b^{53, 2}_1 ∧  b^{53, 2}_0 ∧ true) 
c  in CNF:
c    -b^{53, 2}_2 ∨ -b^{53, 2}_1 ∨ -b^{53, 2}_0 ∨ false 
c  in DIMACS:
-17069 -17070 -17071  0

c i = 3
c  -2+1 --> -1
c    ( b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧  p_159) -> ( b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0)
c  in CNF:
c    -b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨  b^{53, 4}_2
c    -b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_1
c    -b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨  b^{53, 4}_0
c  in DIMACS:
-17072 -17073  17074 -159  17075 0
-17072 -17073  17074 -159 -17076 0
-17072 -17073  17074 -159  17077 0

c  -1+1 --> 0
c    ( b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0 ∧  p_159) -> (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧ -b^{53, 4}_0)
c  in CNF:
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_2
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_1
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_0
c  in DIMACS:
-17072  17073 -17074 -159 -17075 0
-17072  17073 -17074 -159 -17076 0
-17072  17073 -17074 -159 -17077 0

c  0+1 --> 1
c    (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧  p_159) -> (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0)
c  in CNF:
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_2
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_1
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨  b^{53, 4}_0
c  in DIMACS:
 17072  17073  17074 -159 -17075 0
 17072  17073  17074 -159 -17076 0
 17072  17073  17074 -159  17077 0

c  1+1 --> 2
c    (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0 ∧  p_159) -> (-b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0)
c  in CNF:
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_2
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨  b^{53, 4}_1
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ -p_159 ∨ -b^{53, 4}_0
c  in DIMACS:
 17072  17073 -17074 -159 -17075 0
 17072  17073 -17074 -159  17076 0
 17072  17073 -17074 -159 -17077 0

c  2+1 --> break 
c    (-b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧  p_159) -> break
c  in CNF:
c     b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ -p_159 ∨ break
c  in DIMACS:
 17072 -17073  17074 -159 1162 0


c  2-1 --> 1
c    (-b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧ -p_159) -> (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0)
c  in CNF:
c     b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_2
c     b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_1
c     b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨  b^{53, 4}_0
c  in DIMACS:
 17072 -17073  17074  159 -17075 0
 17072 -17073  17074  159 -17076 0
 17072 -17073  17074  159  17077 0

c  1-1 --> 0
c    (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0 ∧ -p_159) -> (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧ -b^{53, 4}_0)
c  in CNF:
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_2
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_1
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_0
c  in DIMACS:
 17072  17073 -17074  159 -17075 0
 17072  17073 -17074  159 -17076 0
 17072  17073 -17074  159 -17077 0

c  0-1 --> -1
c    (-b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧ -p_159) -> ( b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0)
c  in CNF:
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨  b^{53, 4}_2
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_1
c     b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨  b^{53, 4}_0
c  in DIMACS:
 17072  17073  17074  159  17075 0
 17072  17073  17074  159 -17076 0
 17072  17073  17074  159  17077 0

c  -1-1 --> -2
c    ( b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧  b^{53, 3}_0 ∧ -p_159) -> ( b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0)
c  in CNF:
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨  b^{53, 4}_2
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨  b^{53, 4}_1
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨  p_159 ∨ -b^{53, 4}_0
c  in DIMACS:
-17072  17073 -17074  159  17075 0
-17072  17073 -17074  159  17076 0
-17072  17073 -17074  159 -17077 0

c  -2-1 --> break 
c    ( b^{53, 3}_2 ∧  b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧ -p_159) -> break
c  in CNF:
c    -b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨  b^{53, 3}_0 ∨  p_159 ∨ break
c  in DIMACS:
-17072 -17073  17074  159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 3}_2 ∧ -b^{53, 3}_1 ∧ -b^{53, 3}_0 ∧ true) 
c  in CNF:
c    -b^{53, 3}_2 ∨  b^{53, 3}_1 ∨  b^{53, 3}_0 ∨ false 
c  in DIMACS:
-17072  17073  17074  0

c  3 does not represent an automaton state.
c    -(-b^{53, 3}_2 ∧  b^{53, 3}_1 ∧  b^{53, 3}_0 ∧ true) 
c  in CNF:
c     b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ false 
c  in DIMACS:
 17072 -17073 -17074  0
c  -3 does not represent an automaton state.
c    -( b^{53, 3}_2 ∧  b^{53, 3}_1 ∧  b^{53, 3}_0 ∧ true) 
c  in CNF:
c    -b^{53, 3}_2 ∨ -b^{53, 3}_1 ∨ -b^{53, 3}_0 ∨ false 
c  in DIMACS:
-17072 -17073 -17074  0

c i = 4
c  -2+1 --> -1
c    ( b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧  p_212) -> ( b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0)
c  in CNF:
c    -b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨  b^{53, 5}_2
c    -b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_1
c    -b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨  b^{53, 5}_0
c  in DIMACS:
-17075 -17076  17077 -212  17078 0
-17075 -17076  17077 -212 -17079 0
-17075 -17076  17077 -212  17080 0

c  -1+1 --> 0
c    ( b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0 ∧  p_212) -> (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧ -b^{53, 5}_0)
c  in CNF:
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_2
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_1
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_0
c  in DIMACS:
-17075  17076 -17077 -212 -17078 0
-17075  17076 -17077 -212 -17079 0
-17075  17076 -17077 -212 -17080 0

c  0+1 --> 1
c    (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧  p_212) -> (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0)
c  in CNF:
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_2
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_1
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨  b^{53, 5}_0
c  in DIMACS:
 17075  17076  17077 -212 -17078 0
 17075  17076  17077 -212 -17079 0
 17075  17076  17077 -212  17080 0

c  1+1 --> 2
c    (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0 ∧  p_212) -> (-b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0)
c  in CNF:
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_2
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨  b^{53, 5}_1
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ -p_212 ∨ -b^{53, 5}_0
c  in DIMACS:
 17075  17076 -17077 -212 -17078 0
 17075  17076 -17077 -212  17079 0
 17075  17076 -17077 -212 -17080 0

c  2+1 --> break 
c    (-b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧  p_212) -> break
c  in CNF:
c     b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 17075 -17076  17077 -212 1162 0


c  2-1 --> 1
c    (-b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧ -p_212) -> (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0)
c  in CNF:
c     b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_2
c     b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_1
c     b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨  b^{53, 5}_0
c  in DIMACS:
 17075 -17076  17077  212 -17078 0
 17075 -17076  17077  212 -17079 0
 17075 -17076  17077  212  17080 0

c  1-1 --> 0
c    (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0 ∧ -p_212) -> (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧ -b^{53, 5}_0)
c  in CNF:
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_2
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_1
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_0
c  in DIMACS:
 17075  17076 -17077  212 -17078 0
 17075  17076 -17077  212 -17079 0
 17075  17076 -17077  212 -17080 0

c  0-1 --> -1
c    (-b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧ -p_212) -> ( b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0)
c  in CNF:
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨  b^{53, 5}_2
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_1
c     b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨  b^{53, 5}_0
c  in DIMACS:
 17075  17076  17077  212  17078 0
 17075  17076  17077  212 -17079 0
 17075  17076  17077  212  17080 0

c  -1-1 --> -2
c    ( b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧  b^{53, 4}_0 ∧ -p_212) -> ( b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0)
c  in CNF:
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨  b^{53, 5}_2
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨  b^{53, 5}_1
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨  p_212 ∨ -b^{53, 5}_0
c  in DIMACS:
-17075  17076 -17077  212  17078 0
-17075  17076 -17077  212  17079 0
-17075  17076 -17077  212 -17080 0

c  -2-1 --> break 
c    ( b^{53, 4}_2 ∧  b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨  b^{53, 4}_0 ∨  p_212 ∨ break
c  in DIMACS:
-17075 -17076  17077  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 4}_2 ∧ -b^{53, 4}_1 ∧ -b^{53, 4}_0 ∧ true) 
c  in CNF:
c    -b^{53, 4}_2 ∨  b^{53, 4}_1 ∨  b^{53, 4}_0 ∨ false 
c  in DIMACS:
-17075  17076  17077  0

c  3 does not represent an automaton state.
c    -(-b^{53, 4}_2 ∧  b^{53, 4}_1 ∧  b^{53, 4}_0 ∧ true) 
c  in CNF:
c     b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ false 
c  in DIMACS:
 17075 -17076 -17077  0
c  -3 does not represent an automaton state.
c    -( b^{53, 4}_2 ∧  b^{53, 4}_1 ∧  b^{53, 4}_0 ∧ true) 
c  in CNF:
c    -b^{53, 4}_2 ∨ -b^{53, 4}_1 ∨ -b^{53, 4}_0 ∨ false 
c  in DIMACS:
-17075 -17076 -17077  0

c i = 5
c  -2+1 --> -1
c    ( b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧  p_265) -> ( b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0)
c  in CNF:
c    -b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨  b^{53, 6}_2
c    -b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_1
c    -b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨  b^{53, 6}_0
c  in DIMACS:
-17078 -17079  17080 -265  17081 0
-17078 -17079  17080 -265 -17082 0
-17078 -17079  17080 -265  17083 0

c  -1+1 --> 0
c    ( b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0 ∧  p_265) -> (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧ -b^{53, 6}_0)
c  in CNF:
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_2
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_1
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_0
c  in DIMACS:
-17078  17079 -17080 -265 -17081 0
-17078  17079 -17080 -265 -17082 0
-17078  17079 -17080 -265 -17083 0

c  0+1 --> 1
c    (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧  p_265) -> (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0)
c  in CNF:
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_2
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_1
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨  b^{53, 6}_0
c  in DIMACS:
 17078  17079  17080 -265 -17081 0
 17078  17079  17080 -265 -17082 0
 17078  17079  17080 -265  17083 0

c  1+1 --> 2
c    (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0 ∧  p_265) -> (-b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0)
c  in CNF:
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_2
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨  b^{53, 6}_1
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ -p_265 ∨ -b^{53, 6}_0
c  in DIMACS:
 17078  17079 -17080 -265 -17081 0
 17078  17079 -17080 -265  17082 0
 17078  17079 -17080 -265 -17083 0

c  2+1 --> break 
c    (-b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧  p_265) -> break
c  in CNF:
c     b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ -p_265 ∨ break
c  in DIMACS:
 17078 -17079  17080 -265 1162 0


c  2-1 --> 1
c    (-b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧ -p_265) -> (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0)
c  in CNF:
c     b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_2
c     b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_1
c     b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨  b^{53, 6}_0
c  in DIMACS:
 17078 -17079  17080  265 -17081 0
 17078 -17079  17080  265 -17082 0
 17078 -17079  17080  265  17083 0

c  1-1 --> 0
c    (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0 ∧ -p_265) -> (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧ -b^{53, 6}_0)
c  in CNF:
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_2
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_1
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_0
c  in DIMACS:
 17078  17079 -17080  265 -17081 0
 17078  17079 -17080  265 -17082 0
 17078  17079 -17080  265 -17083 0

c  0-1 --> -1
c    (-b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧ -p_265) -> ( b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0)
c  in CNF:
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨  b^{53, 6}_2
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_1
c     b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨  b^{53, 6}_0
c  in DIMACS:
 17078  17079  17080  265  17081 0
 17078  17079  17080  265 -17082 0
 17078  17079  17080  265  17083 0

c  -1-1 --> -2
c    ( b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧  b^{53, 5}_0 ∧ -p_265) -> ( b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0)
c  in CNF:
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨  b^{53, 6}_2
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨  b^{53, 6}_1
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨  p_265 ∨ -b^{53, 6}_0
c  in DIMACS:
-17078  17079 -17080  265  17081 0
-17078  17079 -17080  265  17082 0
-17078  17079 -17080  265 -17083 0

c  -2-1 --> break 
c    ( b^{53, 5}_2 ∧  b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧ -p_265) -> break
c  in CNF:
c    -b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨  b^{53, 5}_0 ∨  p_265 ∨ break
c  in DIMACS:
-17078 -17079  17080  265 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 5}_2 ∧ -b^{53, 5}_1 ∧ -b^{53, 5}_0 ∧ true) 
c  in CNF:
c    -b^{53, 5}_2 ∨  b^{53, 5}_1 ∨  b^{53, 5}_0 ∨ false 
c  in DIMACS:
-17078  17079  17080  0

c  3 does not represent an automaton state.
c    -(-b^{53, 5}_2 ∧  b^{53, 5}_1 ∧  b^{53, 5}_0 ∧ true) 
c  in CNF:
c     b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ false 
c  in DIMACS:
 17078 -17079 -17080  0
c  -3 does not represent an automaton state.
c    -( b^{53, 5}_2 ∧  b^{53, 5}_1 ∧  b^{53, 5}_0 ∧ true) 
c  in CNF:
c    -b^{53, 5}_2 ∨ -b^{53, 5}_1 ∨ -b^{53, 5}_0 ∨ false 
c  in DIMACS:
-17078 -17079 -17080  0

c i = 6
c  -2+1 --> -1
c    ( b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧  p_318) -> ( b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0)
c  in CNF:
c    -b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨  b^{53, 7}_2
c    -b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_1
c    -b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨  b^{53, 7}_0
c  in DIMACS:
-17081 -17082  17083 -318  17084 0
-17081 -17082  17083 -318 -17085 0
-17081 -17082  17083 -318  17086 0

c  -1+1 --> 0
c    ( b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0 ∧  p_318) -> (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧ -b^{53, 7}_0)
c  in CNF:
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_2
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_1
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_0
c  in DIMACS:
-17081  17082 -17083 -318 -17084 0
-17081  17082 -17083 -318 -17085 0
-17081  17082 -17083 -318 -17086 0

c  0+1 --> 1
c    (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧  p_318) -> (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0)
c  in CNF:
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_2
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_1
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨  b^{53, 7}_0
c  in DIMACS:
 17081  17082  17083 -318 -17084 0
 17081  17082  17083 -318 -17085 0
 17081  17082  17083 -318  17086 0

c  1+1 --> 2
c    (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0 ∧  p_318) -> (-b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0)
c  in CNF:
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_2
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨  b^{53, 7}_1
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ -p_318 ∨ -b^{53, 7}_0
c  in DIMACS:
 17081  17082 -17083 -318 -17084 0
 17081  17082 -17083 -318  17085 0
 17081  17082 -17083 -318 -17086 0

c  2+1 --> break 
c    (-b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧  p_318) -> break
c  in CNF:
c     b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 17081 -17082  17083 -318 1162 0


c  2-1 --> 1
c    (-b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧ -p_318) -> (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0)
c  in CNF:
c     b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_2
c     b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_1
c     b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨  b^{53, 7}_0
c  in DIMACS:
 17081 -17082  17083  318 -17084 0
 17081 -17082  17083  318 -17085 0
 17081 -17082  17083  318  17086 0

c  1-1 --> 0
c    (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0 ∧ -p_318) -> (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧ -b^{53, 7}_0)
c  in CNF:
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_2
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_1
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_0
c  in DIMACS:
 17081  17082 -17083  318 -17084 0
 17081  17082 -17083  318 -17085 0
 17081  17082 -17083  318 -17086 0

c  0-1 --> -1
c    (-b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧ -p_318) -> ( b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0)
c  in CNF:
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨  b^{53, 7}_2
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_1
c     b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨  b^{53, 7}_0
c  in DIMACS:
 17081  17082  17083  318  17084 0
 17081  17082  17083  318 -17085 0
 17081  17082  17083  318  17086 0

c  -1-1 --> -2
c    ( b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧  b^{53, 6}_0 ∧ -p_318) -> ( b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0)
c  in CNF:
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨  b^{53, 7}_2
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨  b^{53, 7}_1
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨  p_318 ∨ -b^{53, 7}_0
c  in DIMACS:
-17081  17082 -17083  318  17084 0
-17081  17082 -17083  318  17085 0
-17081  17082 -17083  318 -17086 0

c  -2-1 --> break 
c    ( b^{53, 6}_2 ∧  b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨  b^{53, 6}_0 ∨  p_318 ∨ break
c  in DIMACS:
-17081 -17082  17083  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 6}_2 ∧ -b^{53, 6}_1 ∧ -b^{53, 6}_0 ∧ true) 
c  in CNF:
c    -b^{53, 6}_2 ∨  b^{53, 6}_1 ∨  b^{53, 6}_0 ∨ false 
c  in DIMACS:
-17081  17082  17083  0

c  3 does not represent an automaton state.
c    -(-b^{53, 6}_2 ∧  b^{53, 6}_1 ∧  b^{53, 6}_0 ∧ true) 
c  in CNF:
c     b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ false 
c  in DIMACS:
 17081 -17082 -17083  0
c  -3 does not represent an automaton state.
c    -( b^{53, 6}_2 ∧  b^{53, 6}_1 ∧  b^{53, 6}_0 ∧ true) 
c  in CNF:
c    -b^{53, 6}_2 ∨ -b^{53, 6}_1 ∨ -b^{53, 6}_0 ∨ false 
c  in DIMACS:
-17081 -17082 -17083  0

c i = 7
c  -2+1 --> -1
c    ( b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧  p_371) -> ( b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0)
c  in CNF:
c    -b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨  b^{53, 8}_2
c    -b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_1
c    -b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨  b^{53, 8}_0
c  in DIMACS:
-17084 -17085  17086 -371  17087 0
-17084 -17085  17086 -371 -17088 0
-17084 -17085  17086 -371  17089 0

c  -1+1 --> 0
c    ( b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0 ∧  p_371) -> (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧ -b^{53, 8}_0)
c  in CNF:
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_2
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_1
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_0
c  in DIMACS:
-17084  17085 -17086 -371 -17087 0
-17084  17085 -17086 -371 -17088 0
-17084  17085 -17086 -371 -17089 0

c  0+1 --> 1
c    (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧  p_371) -> (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0)
c  in CNF:
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_2
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_1
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨  b^{53, 8}_0
c  in DIMACS:
 17084  17085  17086 -371 -17087 0
 17084  17085  17086 -371 -17088 0
 17084  17085  17086 -371  17089 0

c  1+1 --> 2
c    (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0 ∧  p_371) -> (-b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0)
c  in CNF:
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_2
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨  b^{53, 8}_1
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ -p_371 ∨ -b^{53, 8}_0
c  in DIMACS:
 17084  17085 -17086 -371 -17087 0
 17084  17085 -17086 -371  17088 0
 17084  17085 -17086 -371 -17089 0

c  2+1 --> break 
c    (-b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧  p_371) -> break
c  in CNF:
c     b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ -p_371 ∨ break
c  in DIMACS:
 17084 -17085  17086 -371 1162 0


c  2-1 --> 1
c    (-b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧ -p_371) -> (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0)
c  in CNF:
c     b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_2
c     b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_1
c     b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨  b^{53, 8}_0
c  in DIMACS:
 17084 -17085  17086  371 -17087 0
 17084 -17085  17086  371 -17088 0
 17084 -17085  17086  371  17089 0

c  1-1 --> 0
c    (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0 ∧ -p_371) -> (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧ -b^{53, 8}_0)
c  in CNF:
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_2
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_1
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_0
c  in DIMACS:
 17084  17085 -17086  371 -17087 0
 17084  17085 -17086  371 -17088 0
 17084  17085 -17086  371 -17089 0

c  0-1 --> -1
c    (-b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧ -p_371) -> ( b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0)
c  in CNF:
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨  b^{53, 8}_2
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_1
c     b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨  b^{53, 8}_0
c  in DIMACS:
 17084  17085  17086  371  17087 0
 17084  17085  17086  371 -17088 0
 17084  17085  17086  371  17089 0

c  -1-1 --> -2
c    ( b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧  b^{53, 7}_0 ∧ -p_371) -> ( b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0)
c  in CNF:
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨  b^{53, 8}_2
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨  b^{53, 8}_1
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨  p_371 ∨ -b^{53, 8}_0
c  in DIMACS:
-17084  17085 -17086  371  17087 0
-17084  17085 -17086  371  17088 0
-17084  17085 -17086  371 -17089 0

c  -2-1 --> break 
c    ( b^{53, 7}_2 ∧  b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧ -p_371) -> break
c  in CNF:
c    -b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨  b^{53, 7}_0 ∨  p_371 ∨ break
c  in DIMACS:
-17084 -17085  17086  371 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 7}_2 ∧ -b^{53, 7}_1 ∧ -b^{53, 7}_0 ∧ true) 
c  in CNF:
c    -b^{53, 7}_2 ∨  b^{53, 7}_1 ∨  b^{53, 7}_0 ∨ false 
c  in DIMACS:
-17084  17085  17086  0

c  3 does not represent an automaton state.
c    -(-b^{53, 7}_2 ∧  b^{53, 7}_1 ∧  b^{53, 7}_0 ∧ true) 
c  in CNF:
c     b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ false 
c  in DIMACS:
 17084 -17085 -17086  0
c  -3 does not represent an automaton state.
c    -( b^{53, 7}_2 ∧  b^{53, 7}_1 ∧  b^{53, 7}_0 ∧ true) 
c  in CNF:
c    -b^{53, 7}_2 ∨ -b^{53, 7}_1 ∨ -b^{53, 7}_0 ∨ false 
c  in DIMACS:
-17084 -17085 -17086  0

c i = 8
c  -2+1 --> -1
c    ( b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧  p_424) -> ( b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0)
c  in CNF:
c    -b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨  b^{53, 9}_2
c    -b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_1
c    -b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨  b^{53, 9}_0
c  in DIMACS:
-17087 -17088  17089 -424  17090 0
-17087 -17088  17089 -424 -17091 0
-17087 -17088  17089 -424  17092 0

c  -1+1 --> 0
c    ( b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0 ∧  p_424) -> (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧ -b^{53, 9}_0)
c  in CNF:
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_2
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_1
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_0
c  in DIMACS:
-17087  17088 -17089 -424 -17090 0
-17087  17088 -17089 -424 -17091 0
-17087  17088 -17089 -424 -17092 0

c  0+1 --> 1
c    (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧  p_424) -> (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0)
c  in CNF:
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_2
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_1
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨  b^{53, 9}_0
c  in DIMACS:
 17087  17088  17089 -424 -17090 0
 17087  17088  17089 -424 -17091 0
 17087  17088  17089 -424  17092 0

c  1+1 --> 2
c    (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0 ∧  p_424) -> (-b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0)
c  in CNF:
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_2
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨  b^{53, 9}_1
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ -p_424 ∨ -b^{53, 9}_0
c  in DIMACS:
 17087  17088 -17089 -424 -17090 0
 17087  17088 -17089 -424  17091 0
 17087  17088 -17089 -424 -17092 0

c  2+1 --> break 
c    (-b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧  p_424) -> break
c  in CNF:
c     b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 17087 -17088  17089 -424 1162 0


c  2-1 --> 1
c    (-b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧ -p_424) -> (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0)
c  in CNF:
c     b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_2
c     b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_1
c     b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨  b^{53, 9}_0
c  in DIMACS:
 17087 -17088  17089  424 -17090 0
 17087 -17088  17089  424 -17091 0
 17087 -17088  17089  424  17092 0

c  1-1 --> 0
c    (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0 ∧ -p_424) -> (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧ -b^{53, 9}_0)
c  in CNF:
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_2
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_1
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_0
c  in DIMACS:
 17087  17088 -17089  424 -17090 0
 17087  17088 -17089  424 -17091 0
 17087  17088 -17089  424 -17092 0

c  0-1 --> -1
c    (-b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧ -p_424) -> ( b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0)
c  in CNF:
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨  b^{53, 9}_2
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_1
c     b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨  b^{53, 9}_0
c  in DIMACS:
 17087  17088  17089  424  17090 0
 17087  17088  17089  424 -17091 0
 17087  17088  17089  424  17092 0

c  -1-1 --> -2
c    ( b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧  b^{53, 8}_0 ∧ -p_424) -> ( b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0)
c  in CNF:
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨  b^{53, 9}_2
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨  b^{53, 9}_1
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨  p_424 ∨ -b^{53, 9}_0
c  in DIMACS:
-17087  17088 -17089  424  17090 0
-17087  17088 -17089  424  17091 0
-17087  17088 -17089  424 -17092 0

c  -2-1 --> break 
c    ( b^{53, 8}_2 ∧  b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨  b^{53, 8}_0 ∨  p_424 ∨ break
c  in DIMACS:
-17087 -17088  17089  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 8}_2 ∧ -b^{53, 8}_1 ∧ -b^{53, 8}_0 ∧ true) 
c  in CNF:
c    -b^{53, 8}_2 ∨  b^{53, 8}_1 ∨  b^{53, 8}_0 ∨ false 
c  in DIMACS:
-17087  17088  17089  0

c  3 does not represent an automaton state.
c    -(-b^{53, 8}_2 ∧  b^{53, 8}_1 ∧  b^{53, 8}_0 ∧ true) 
c  in CNF:
c     b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ false 
c  in DIMACS:
 17087 -17088 -17089  0
c  -3 does not represent an automaton state.
c    -( b^{53, 8}_2 ∧  b^{53, 8}_1 ∧  b^{53, 8}_0 ∧ true) 
c  in CNF:
c    -b^{53, 8}_2 ∨ -b^{53, 8}_1 ∨ -b^{53, 8}_0 ∨ false 
c  in DIMACS:
-17087 -17088 -17089  0

c i = 9
c  -2+1 --> -1
c    ( b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧  p_477) -> ( b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0)
c  in CNF:
c    -b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨  b^{53, 10}_2
c    -b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_1
c    -b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨  b^{53, 10}_0
c  in DIMACS:
-17090 -17091  17092 -477  17093 0
-17090 -17091  17092 -477 -17094 0
-17090 -17091  17092 -477  17095 0

c  -1+1 --> 0
c    ( b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0 ∧  p_477) -> (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧ -b^{53, 10}_0)
c  in CNF:
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_2
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_1
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_0
c  in DIMACS:
-17090  17091 -17092 -477 -17093 0
-17090  17091 -17092 -477 -17094 0
-17090  17091 -17092 -477 -17095 0

c  0+1 --> 1
c    (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧  p_477) -> (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0)
c  in CNF:
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_2
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_1
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨  b^{53, 10}_0
c  in DIMACS:
 17090  17091  17092 -477 -17093 0
 17090  17091  17092 -477 -17094 0
 17090  17091  17092 -477  17095 0

c  1+1 --> 2
c    (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0 ∧  p_477) -> (-b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0)
c  in CNF:
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_2
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨  b^{53, 10}_1
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ -p_477 ∨ -b^{53, 10}_0
c  in DIMACS:
 17090  17091 -17092 -477 -17093 0
 17090  17091 -17092 -477  17094 0
 17090  17091 -17092 -477 -17095 0

c  2+1 --> break 
c    (-b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧  p_477) -> break
c  in CNF:
c     b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ -p_477 ∨ break
c  in DIMACS:
 17090 -17091  17092 -477 1162 0


c  2-1 --> 1
c    (-b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧ -p_477) -> (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0)
c  in CNF:
c     b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_2
c     b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_1
c     b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨  b^{53, 10}_0
c  in DIMACS:
 17090 -17091  17092  477 -17093 0
 17090 -17091  17092  477 -17094 0
 17090 -17091  17092  477  17095 0

c  1-1 --> 0
c    (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0 ∧ -p_477) -> (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧ -b^{53, 10}_0)
c  in CNF:
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_2
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_1
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_0
c  in DIMACS:
 17090  17091 -17092  477 -17093 0
 17090  17091 -17092  477 -17094 0
 17090  17091 -17092  477 -17095 0

c  0-1 --> -1
c    (-b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧ -p_477) -> ( b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0)
c  in CNF:
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨  b^{53, 10}_2
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_1
c     b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨  b^{53, 10}_0
c  in DIMACS:
 17090  17091  17092  477  17093 0
 17090  17091  17092  477 -17094 0
 17090  17091  17092  477  17095 0

c  -1-1 --> -2
c    ( b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧  b^{53, 9}_0 ∧ -p_477) -> ( b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0)
c  in CNF:
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨  b^{53, 10}_2
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨  b^{53, 10}_1
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨  p_477 ∨ -b^{53, 10}_0
c  in DIMACS:
-17090  17091 -17092  477  17093 0
-17090  17091 -17092  477  17094 0
-17090  17091 -17092  477 -17095 0

c  -2-1 --> break 
c    ( b^{53, 9}_2 ∧  b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧ -p_477) -> break
c  in CNF:
c    -b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨  b^{53, 9}_0 ∨  p_477 ∨ break
c  in DIMACS:
-17090 -17091  17092  477 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 9}_2 ∧ -b^{53, 9}_1 ∧ -b^{53, 9}_0 ∧ true) 
c  in CNF:
c    -b^{53, 9}_2 ∨  b^{53, 9}_1 ∨  b^{53, 9}_0 ∨ false 
c  in DIMACS:
-17090  17091  17092  0

c  3 does not represent an automaton state.
c    -(-b^{53, 9}_2 ∧  b^{53, 9}_1 ∧  b^{53, 9}_0 ∧ true) 
c  in CNF:
c     b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ false 
c  in DIMACS:
 17090 -17091 -17092  0
c  -3 does not represent an automaton state.
c    -( b^{53, 9}_2 ∧  b^{53, 9}_1 ∧  b^{53, 9}_0 ∧ true) 
c  in CNF:
c    -b^{53, 9}_2 ∨ -b^{53, 9}_1 ∨ -b^{53, 9}_0 ∨ false 
c  in DIMACS:
-17090 -17091 -17092  0

c i = 10
c  -2+1 --> -1
c    ( b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧  p_530) -> ( b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0)
c  in CNF:
c    -b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨  b^{53, 11}_2
c    -b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_1
c    -b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨  b^{53, 11}_0
c  in DIMACS:
-17093 -17094  17095 -530  17096 0
-17093 -17094  17095 -530 -17097 0
-17093 -17094  17095 -530  17098 0

c  -1+1 --> 0
c    ( b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0 ∧  p_530) -> (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧ -b^{53, 11}_0)
c  in CNF:
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_2
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_1
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_0
c  in DIMACS:
-17093  17094 -17095 -530 -17096 0
-17093  17094 -17095 -530 -17097 0
-17093  17094 -17095 -530 -17098 0

c  0+1 --> 1
c    (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧  p_530) -> (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0)
c  in CNF:
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_2
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_1
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨  b^{53, 11}_0
c  in DIMACS:
 17093  17094  17095 -530 -17096 0
 17093  17094  17095 -530 -17097 0
 17093  17094  17095 -530  17098 0

c  1+1 --> 2
c    (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0 ∧  p_530) -> (-b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0)
c  in CNF:
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_2
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨  b^{53, 11}_1
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ -p_530 ∨ -b^{53, 11}_0
c  in DIMACS:
 17093  17094 -17095 -530 -17096 0
 17093  17094 -17095 -530  17097 0
 17093  17094 -17095 -530 -17098 0

c  2+1 --> break 
c    (-b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧  p_530) -> break
c  in CNF:
c     b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 17093 -17094  17095 -530 1162 0


c  2-1 --> 1
c    (-b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧ -p_530) -> (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0)
c  in CNF:
c     b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_2
c     b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_1
c     b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨  b^{53, 11}_0
c  in DIMACS:
 17093 -17094  17095  530 -17096 0
 17093 -17094  17095  530 -17097 0
 17093 -17094  17095  530  17098 0

c  1-1 --> 0
c    (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0 ∧ -p_530) -> (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧ -b^{53, 11}_0)
c  in CNF:
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_2
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_1
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_0
c  in DIMACS:
 17093  17094 -17095  530 -17096 0
 17093  17094 -17095  530 -17097 0
 17093  17094 -17095  530 -17098 0

c  0-1 --> -1
c    (-b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧ -p_530) -> ( b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0)
c  in CNF:
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨  b^{53, 11}_2
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_1
c     b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨  b^{53, 11}_0
c  in DIMACS:
 17093  17094  17095  530  17096 0
 17093  17094  17095  530 -17097 0
 17093  17094  17095  530  17098 0

c  -1-1 --> -2
c    ( b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧  b^{53, 10}_0 ∧ -p_530) -> ( b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0)
c  in CNF:
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨  b^{53, 11}_2
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨  b^{53, 11}_1
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨  p_530 ∨ -b^{53, 11}_0
c  in DIMACS:
-17093  17094 -17095  530  17096 0
-17093  17094 -17095  530  17097 0
-17093  17094 -17095  530 -17098 0

c  -2-1 --> break 
c    ( b^{53, 10}_2 ∧  b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨  b^{53, 10}_0 ∨  p_530 ∨ break
c  in DIMACS:
-17093 -17094  17095  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 10}_2 ∧ -b^{53, 10}_1 ∧ -b^{53, 10}_0 ∧ true) 
c  in CNF:
c    -b^{53, 10}_2 ∨  b^{53, 10}_1 ∨  b^{53, 10}_0 ∨ false 
c  in DIMACS:
-17093  17094  17095  0

c  3 does not represent an automaton state.
c    -(-b^{53, 10}_2 ∧  b^{53, 10}_1 ∧  b^{53, 10}_0 ∧ true) 
c  in CNF:
c     b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ false 
c  in DIMACS:
 17093 -17094 -17095  0
c  -3 does not represent an automaton state.
c    -( b^{53, 10}_2 ∧  b^{53, 10}_1 ∧  b^{53, 10}_0 ∧ true) 
c  in CNF:
c    -b^{53, 10}_2 ∨ -b^{53, 10}_1 ∨ -b^{53, 10}_0 ∨ false 
c  in DIMACS:
-17093 -17094 -17095  0

c i = 11
c  -2+1 --> -1
c    ( b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧  p_583) -> ( b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0)
c  in CNF:
c    -b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨  b^{53, 12}_2
c    -b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_1
c    -b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨  b^{53, 12}_0
c  in DIMACS:
-17096 -17097  17098 -583  17099 0
-17096 -17097  17098 -583 -17100 0
-17096 -17097  17098 -583  17101 0

c  -1+1 --> 0
c    ( b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0 ∧  p_583) -> (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧ -b^{53, 12}_0)
c  in CNF:
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_2
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_1
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_0
c  in DIMACS:
-17096  17097 -17098 -583 -17099 0
-17096  17097 -17098 -583 -17100 0
-17096  17097 -17098 -583 -17101 0

c  0+1 --> 1
c    (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧  p_583) -> (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0)
c  in CNF:
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_2
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_1
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨  b^{53, 12}_0
c  in DIMACS:
 17096  17097  17098 -583 -17099 0
 17096  17097  17098 -583 -17100 0
 17096  17097  17098 -583  17101 0

c  1+1 --> 2
c    (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0 ∧  p_583) -> (-b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0)
c  in CNF:
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_2
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨  b^{53, 12}_1
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ -p_583 ∨ -b^{53, 12}_0
c  in DIMACS:
 17096  17097 -17098 -583 -17099 0
 17096  17097 -17098 -583  17100 0
 17096  17097 -17098 -583 -17101 0

c  2+1 --> break 
c    (-b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧  p_583) -> break
c  in CNF:
c     b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ -p_583 ∨ break
c  in DIMACS:
 17096 -17097  17098 -583 1162 0


c  2-1 --> 1
c    (-b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧ -p_583) -> (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0)
c  in CNF:
c     b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_2
c     b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_1
c     b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨  b^{53, 12}_0
c  in DIMACS:
 17096 -17097  17098  583 -17099 0
 17096 -17097  17098  583 -17100 0
 17096 -17097  17098  583  17101 0

c  1-1 --> 0
c    (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0 ∧ -p_583) -> (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧ -b^{53, 12}_0)
c  in CNF:
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_2
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_1
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_0
c  in DIMACS:
 17096  17097 -17098  583 -17099 0
 17096  17097 -17098  583 -17100 0
 17096  17097 -17098  583 -17101 0

c  0-1 --> -1
c    (-b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧ -p_583) -> ( b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0)
c  in CNF:
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨  b^{53, 12}_2
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_1
c     b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨  b^{53, 12}_0
c  in DIMACS:
 17096  17097  17098  583  17099 0
 17096  17097  17098  583 -17100 0
 17096  17097  17098  583  17101 0

c  -1-1 --> -2
c    ( b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧  b^{53, 11}_0 ∧ -p_583) -> ( b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0)
c  in CNF:
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨  b^{53, 12}_2
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨  b^{53, 12}_1
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨  p_583 ∨ -b^{53, 12}_0
c  in DIMACS:
-17096  17097 -17098  583  17099 0
-17096  17097 -17098  583  17100 0
-17096  17097 -17098  583 -17101 0

c  -2-1 --> break 
c    ( b^{53, 11}_2 ∧  b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧ -p_583) -> break
c  in CNF:
c    -b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨  b^{53, 11}_0 ∨  p_583 ∨ break
c  in DIMACS:
-17096 -17097  17098  583 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 11}_2 ∧ -b^{53, 11}_1 ∧ -b^{53, 11}_0 ∧ true) 
c  in CNF:
c    -b^{53, 11}_2 ∨  b^{53, 11}_1 ∨  b^{53, 11}_0 ∨ false 
c  in DIMACS:
-17096  17097  17098  0

c  3 does not represent an automaton state.
c    -(-b^{53, 11}_2 ∧  b^{53, 11}_1 ∧  b^{53, 11}_0 ∧ true) 
c  in CNF:
c     b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ false 
c  in DIMACS:
 17096 -17097 -17098  0
c  -3 does not represent an automaton state.
c    -( b^{53, 11}_2 ∧  b^{53, 11}_1 ∧  b^{53, 11}_0 ∧ true) 
c  in CNF:
c    -b^{53, 11}_2 ∨ -b^{53, 11}_1 ∨ -b^{53, 11}_0 ∨ false 
c  in DIMACS:
-17096 -17097 -17098  0

c i = 12
c  -2+1 --> -1
c    ( b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧  p_636) -> ( b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0)
c  in CNF:
c    -b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨  b^{53, 13}_2
c    -b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_1
c    -b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨  b^{53, 13}_0
c  in DIMACS:
-17099 -17100  17101 -636  17102 0
-17099 -17100  17101 -636 -17103 0
-17099 -17100  17101 -636  17104 0

c  -1+1 --> 0
c    ( b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0 ∧  p_636) -> (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧ -b^{53, 13}_0)
c  in CNF:
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_2
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_1
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_0
c  in DIMACS:
-17099  17100 -17101 -636 -17102 0
-17099  17100 -17101 -636 -17103 0
-17099  17100 -17101 -636 -17104 0

c  0+1 --> 1
c    (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧  p_636) -> (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0)
c  in CNF:
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_2
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_1
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨  b^{53, 13}_0
c  in DIMACS:
 17099  17100  17101 -636 -17102 0
 17099  17100  17101 -636 -17103 0
 17099  17100  17101 -636  17104 0

c  1+1 --> 2
c    (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0 ∧  p_636) -> (-b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0)
c  in CNF:
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_2
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨  b^{53, 13}_1
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ -p_636 ∨ -b^{53, 13}_0
c  in DIMACS:
 17099  17100 -17101 -636 -17102 0
 17099  17100 -17101 -636  17103 0
 17099  17100 -17101 -636 -17104 0

c  2+1 --> break 
c    (-b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧  p_636) -> break
c  in CNF:
c     b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 17099 -17100  17101 -636 1162 0


c  2-1 --> 1
c    (-b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧ -p_636) -> (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0)
c  in CNF:
c     b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_2
c     b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_1
c     b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨  b^{53, 13}_0
c  in DIMACS:
 17099 -17100  17101  636 -17102 0
 17099 -17100  17101  636 -17103 0
 17099 -17100  17101  636  17104 0

c  1-1 --> 0
c    (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0 ∧ -p_636) -> (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧ -b^{53, 13}_0)
c  in CNF:
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_2
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_1
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_0
c  in DIMACS:
 17099  17100 -17101  636 -17102 0
 17099  17100 -17101  636 -17103 0
 17099  17100 -17101  636 -17104 0

c  0-1 --> -1
c    (-b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧ -p_636) -> ( b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0)
c  in CNF:
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨  b^{53, 13}_2
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_1
c     b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨  b^{53, 13}_0
c  in DIMACS:
 17099  17100  17101  636  17102 0
 17099  17100  17101  636 -17103 0
 17099  17100  17101  636  17104 0

c  -1-1 --> -2
c    ( b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧  b^{53, 12}_0 ∧ -p_636) -> ( b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0)
c  in CNF:
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨  b^{53, 13}_2
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨  b^{53, 13}_1
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨  p_636 ∨ -b^{53, 13}_0
c  in DIMACS:
-17099  17100 -17101  636  17102 0
-17099  17100 -17101  636  17103 0
-17099  17100 -17101  636 -17104 0

c  -2-1 --> break 
c    ( b^{53, 12}_2 ∧  b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨  b^{53, 12}_0 ∨  p_636 ∨ break
c  in DIMACS:
-17099 -17100  17101  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 12}_2 ∧ -b^{53, 12}_1 ∧ -b^{53, 12}_0 ∧ true) 
c  in CNF:
c    -b^{53, 12}_2 ∨  b^{53, 12}_1 ∨  b^{53, 12}_0 ∨ false 
c  in DIMACS:
-17099  17100  17101  0

c  3 does not represent an automaton state.
c    -(-b^{53, 12}_2 ∧  b^{53, 12}_1 ∧  b^{53, 12}_0 ∧ true) 
c  in CNF:
c     b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ false 
c  in DIMACS:
 17099 -17100 -17101  0
c  -3 does not represent an automaton state.
c    -( b^{53, 12}_2 ∧  b^{53, 12}_1 ∧  b^{53, 12}_0 ∧ true) 
c  in CNF:
c    -b^{53, 12}_2 ∨ -b^{53, 12}_1 ∨ -b^{53, 12}_0 ∨ false 
c  in DIMACS:
-17099 -17100 -17101  0

c i = 13
c  -2+1 --> -1
c    ( b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧  p_689) -> ( b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0)
c  in CNF:
c    -b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨  b^{53, 14}_2
c    -b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_1
c    -b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨  b^{53, 14}_0
c  in DIMACS:
-17102 -17103  17104 -689  17105 0
-17102 -17103  17104 -689 -17106 0
-17102 -17103  17104 -689  17107 0

c  -1+1 --> 0
c    ( b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0 ∧  p_689) -> (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧ -b^{53, 14}_0)
c  in CNF:
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_2
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_1
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_0
c  in DIMACS:
-17102  17103 -17104 -689 -17105 0
-17102  17103 -17104 -689 -17106 0
-17102  17103 -17104 -689 -17107 0

c  0+1 --> 1
c    (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧  p_689) -> (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0)
c  in CNF:
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_2
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_1
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨  b^{53, 14}_0
c  in DIMACS:
 17102  17103  17104 -689 -17105 0
 17102  17103  17104 -689 -17106 0
 17102  17103  17104 -689  17107 0

c  1+1 --> 2
c    (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0 ∧  p_689) -> (-b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0)
c  in CNF:
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_2
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨  b^{53, 14}_1
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ -p_689 ∨ -b^{53, 14}_0
c  in DIMACS:
 17102  17103 -17104 -689 -17105 0
 17102  17103 -17104 -689  17106 0
 17102  17103 -17104 -689 -17107 0

c  2+1 --> break 
c    (-b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧  p_689) -> break
c  in CNF:
c     b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ -p_689 ∨ break
c  in DIMACS:
 17102 -17103  17104 -689 1162 0


c  2-1 --> 1
c    (-b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧ -p_689) -> (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0)
c  in CNF:
c     b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_2
c     b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_1
c     b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨  b^{53, 14}_0
c  in DIMACS:
 17102 -17103  17104  689 -17105 0
 17102 -17103  17104  689 -17106 0
 17102 -17103  17104  689  17107 0

c  1-1 --> 0
c    (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0 ∧ -p_689) -> (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧ -b^{53, 14}_0)
c  in CNF:
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_2
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_1
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_0
c  in DIMACS:
 17102  17103 -17104  689 -17105 0
 17102  17103 -17104  689 -17106 0
 17102  17103 -17104  689 -17107 0

c  0-1 --> -1
c    (-b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧ -p_689) -> ( b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0)
c  in CNF:
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨  b^{53, 14}_2
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_1
c     b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨  b^{53, 14}_0
c  in DIMACS:
 17102  17103  17104  689  17105 0
 17102  17103  17104  689 -17106 0
 17102  17103  17104  689  17107 0

c  -1-1 --> -2
c    ( b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧  b^{53, 13}_0 ∧ -p_689) -> ( b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0)
c  in CNF:
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨  b^{53, 14}_2
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨  b^{53, 14}_1
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨  p_689 ∨ -b^{53, 14}_0
c  in DIMACS:
-17102  17103 -17104  689  17105 0
-17102  17103 -17104  689  17106 0
-17102  17103 -17104  689 -17107 0

c  -2-1 --> break 
c    ( b^{53, 13}_2 ∧  b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧ -p_689) -> break
c  in CNF:
c    -b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨  b^{53, 13}_0 ∨  p_689 ∨ break
c  in DIMACS:
-17102 -17103  17104  689 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 13}_2 ∧ -b^{53, 13}_1 ∧ -b^{53, 13}_0 ∧ true) 
c  in CNF:
c    -b^{53, 13}_2 ∨  b^{53, 13}_1 ∨  b^{53, 13}_0 ∨ false 
c  in DIMACS:
-17102  17103  17104  0

c  3 does not represent an automaton state.
c    -(-b^{53, 13}_2 ∧  b^{53, 13}_1 ∧  b^{53, 13}_0 ∧ true) 
c  in CNF:
c     b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ false 
c  in DIMACS:
 17102 -17103 -17104  0
c  -3 does not represent an automaton state.
c    -( b^{53, 13}_2 ∧  b^{53, 13}_1 ∧  b^{53, 13}_0 ∧ true) 
c  in CNF:
c    -b^{53, 13}_2 ∨ -b^{53, 13}_1 ∨ -b^{53, 13}_0 ∨ false 
c  in DIMACS:
-17102 -17103 -17104  0

c i = 14
c  -2+1 --> -1
c    ( b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧  p_742) -> ( b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0)
c  in CNF:
c    -b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨  b^{53, 15}_2
c    -b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_1
c    -b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨  b^{53, 15}_0
c  in DIMACS:
-17105 -17106  17107 -742  17108 0
-17105 -17106  17107 -742 -17109 0
-17105 -17106  17107 -742  17110 0

c  -1+1 --> 0
c    ( b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0 ∧  p_742) -> (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧ -b^{53, 15}_0)
c  in CNF:
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_2
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_1
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_0
c  in DIMACS:
-17105  17106 -17107 -742 -17108 0
-17105  17106 -17107 -742 -17109 0
-17105  17106 -17107 -742 -17110 0

c  0+1 --> 1
c    (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧  p_742) -> (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0)
c  in CNF:
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_2
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_1
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨  b^{53, 15}_0
c  in DIMACS:
 17105  17106  17107 -742 -17108 0
 17105  17106  17107 -742 -17109 0
 17105  17106  17107 -742  17110 0

c  1+1 --> 2
c    (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0 ∧  p_742) -> (-b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0)
c  in CNF:
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_2
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨  b^{53, 15}_1
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ -p_742 ∨ -b^{53, 15}_0
c  in DIMACS:
 17105  17106 -17107 -742 -17108 0
 17105  17106 -17107 -742  17109 0
 17105  17106 -17107 -742 -17110 0

c  2+1 --> break 
c    (-b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧  p_742) -> break
c  in CNF:
c     b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 17105 -17106  17107 -742 1162 0


c  2-1 --> 1
c    (-b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧ -p_742) -> (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0)
c  in CNF:
c     b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_2
c     b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_1
c     b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨  b^{53, 15}_0
c  in DIMACS:
 17105 -17106  17107  742 -17108 0
 17105 -17106  17107  742 -17109 0
 17105 -17106  17107  742  17110 0

c  1-1 --> 0
c    (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0 ∧ -p_742) -> (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧ -b^{53, 15}_0)
c  in CNF:
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_2
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_1
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_0
c  in DIMACS:
 17105  17106 -17107  742 -17108 0
 17105  17106 -17107  742 -17109 0
 17105  17106 -17107  742 -17110 0

c  0-1 --> -1
c    (-b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧ -p_742) -> ( b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0)
c  in CNF:
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨  b^{53, 15}_2
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_1
c     b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨  b^{53, 15}_0
c  in DIMACS:
 17105  17106  17107  742  17108 0
 17105  17106  17107  742 -17109 0
 17105  17106  17107  742  17110 0

c  -1-1 --> -2
c    ( b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧  b^{53, 14}_0 ∧ -p_742) -> ( b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0)
c  in CNF:
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨  b^{53, 15}_2
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨  b^{53, 15}_1
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨  p_742 ∨ -b^{53, 15}_0
c  in DIMACS:
-17105  17106 -17107  742  17108 0
-17105  17106 -17107  742  17109 0
-17105  17106 -17107  742 -17110 0

c  -2-1 --> break 
c    ( b^{53, 14}_2 ∧  b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨  b^{53, 14}_0 ∨  p_742 ∨ break
c  in DIMACS:
-17105 -17106  17107  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 14}_2 ∧ -b^{53, 14}_1 ∧ -b^{53, 14}_0 ∧ true) 
c  in CNF:
c    -b^{53, 14}_2 ∨  b^{53, 14}_1 ∨  b^{53, 14}_0 ∨ false 
c  in DIMACS:
-17105  17106  17107  0

c  3 does not represent an automaton state.
c    -(-b^{53, 14}_2 ∧  b^{53, 14}_1 ∧  b^{53, 14}_0 ∧ true) 
c  in CNF:
c     b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ false 
c  in DIMACS:
 17105 -17106 -17107  0
c  -3 does not represent an automaton state.
c    -( b^{53, 14}_2 ∧  b^{53, 14}_1 ∧  b^{53, 14}_0 ∧ true) 
c  in CNF:
c    -b^{53, 14}_2 ∨ -b^{53, 14}_1 ∨ -b^{53, 14}_0 ∨ false 
c  in DIMACS:
-17105 -17106 -17107  0

c i = 15
c  -2+1 --> -1
c    ( b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧  p_795) -> ( b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0)
c  in CNF:
c    -b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨  b^{53, 16}_2
c    -b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_1
c    -b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨  b^{53, 16}_0
c  in DIMACS:
-17108 -17109  17110 -795  17111 0
-17108 -17109  17110 -795 -17112 0
-17108 -17109  17110 -795  17113 0

c  -1+1 --> 0
c    ( b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0 ∧  p_795) -> (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧ -b^{53, 16}_0)
c  in CNF:
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_2
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_1
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_0
c  in DIMACS:
-17108  17109 -17110 -795 -17111 0
-17108  17109 -17110 -795 -17112 0
-17108  17109 -17110 -795 -17113 0

c  0+1 --> 1
c    (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧  p_795) -> (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0)
c  in CNF:
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_2
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_1
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨  b^{53, 16}_0
c  in DIMACS:
 17108  17109  17110 -795 -17111 0
 17108  17109  17110 -795 -17112 0
 17108  17109  17110 -795  17113 0

c  1+1 --> 2
c    (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0 ∧  p_795) -> (-b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0)
c  in CNF:
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_2
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨  b^{53, 16}_1
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ -p_795 ∨ -b^{53, 16}_0
c  in DIMACS:
 17108  17109 -17110 -795 -17111 0
 17108  17109 -17110 -795  17112 0
 17108  17109 -17110 -795 -17113 0

c  2+1 --> break 
c    (-b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧  p_795) -> break
c  in CNF:
c     b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 17108 -17109  17110 -795 1162 0


c  2-1 --> 1
c    (-b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧ -p_795) -> (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0)
c  in CNF:
c     b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_2
c     b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_1
c     b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨  b^{53, 16}_0
c  in DIMACS:
 17108 -17109  17110  795 -17111 0
 17108 -17109  17110  795 -17112 0
 17108 -17109  17110  795  17113 0

c  1-1 --> 0
c    (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0 ∧ -p_795) -> (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧ -b^{53, 16}_0)
c  in CNF:
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_2
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_1
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_0
c  in DIMACS:
 17108  17109 -17110  795 -17111 0
 17108  17109 -17110  795 -17112 0
 17108  17109 -17110  795 -17113 0

c  0-1 --> -1
c    (-b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧ -p_795) -> ( b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0)
c  in CNF:
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨  b^{53, 16}_2
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_1
c     b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨  b^{53, 16}_0
c  in DIMACS:
 17108  17109  17110  795  17111 0
 17108  17109  17110  795 -17112 0
 17108  17109  17110  795  17113 0

c  -1-1 --> -2
c    ( b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧  b^{53, 15}_0 ∧ -p_795) -> ( b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0)
c  in CNF:
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨  b^{53, 16}_2
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨  b^{53, 16}_1
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨  p_795 ∨ -b^{53, 16}_0
c  in DIMACS:
-17108  17109 -17110  795  17111 0
-17108  17109 -17110  795  17112 0
-17108  17109 -17110  795 -17113 0

c  -2-1 --> break 
c    ( b^{53, 15}_2 ∧  b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨  b^{53, 15}_0 ∨  p_795 ∨ break
c  in DIMACS:
-17108 -17109  17110  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 15}_2 ∧ -b^{53, 15}_1 ∧ -b^{53, 15}_0 ∧ true) 
c  in CNF:
c    -b^{53, 15}_2 ∨  b^{53, 15}_1 ∨  b^{53, 15}_0 ∨ false 
c  in DIMACS:
-17108  17109  17110  0

c  3 does not represent an automaton state.
c    -(-b^{53, 15}_2 ∧  b^{53, 15}_1 ∧  b^{53, 15}_0 ∧ true) 
c  in CNF:
c     b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ false 
c  in DIMACS:
 17108 -17109 -17110  0
c  -3 does not represent an automaton state.
c    -( b^{53, 15}_2 ∧  b^{53, 15}_1 ∧  b^{53, 15}_0 ∧ true) 
c  in CNF:
c    -b^{53, 15}_2 ∨ -b^{53, 15}_1 ∨ -b^{53, 15}_0 ∨ false 
c  in DIMACS:
-17108 -17109 -17110  0

c i = 16
c  -2+1 --> -1
c    ( b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧  p_848) -> ( b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0)
c  in CNF:
c    -b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨  b^{53, 17}_2
c    -b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_1
c    -b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨  b^{53, 17}_0
c  in DIMACS:
-17111 -17112  17113 -848  17114 0
-17111 -17112  17113 -848 -17115 0
-17111 -17112  17113 -848  17116 0

c  -1+1 --> 0
c    ( b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0 ∧  p_848) -> (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧ -b^{53, 17}_0)
c  in CNF:
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_2
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_1
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_0
c  in DIMACS:
-17111  17112 -17113 -848 -17114 0
-17111  17112 -17113 -848 -17115 0
-17111  17112 -17113 -848 -17116 0

c  0+1 --> 1
c    (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧  p_848) -> (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0)
c  in CNF:
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_2
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_1
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨  b^{53, 17}_0
c  in DIMACS:
 17111  17112  17113 -848 -17114 0
 17111  17112  17113 -848 -17115 0
 17111  17112  17113 -848  17116 0

c  1+1 --> 2
c    (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0 ∧  p_848) -> (-b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0)
c  in CNF:
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_2
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨  b^{53, 17}_1
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ -p_848 ∨ -b^{53, 17}_0
c  in DIMACS:
 17111  17112 -17113 -848 -17114 0
 17111  17112 -17113 -848  17115 0
 17111  17112 -17113 -848 -17116 0

c  2+1 --> break 
c    (-b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧  p_848) -> break
c  in CNF:
c     b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 17111 -17112  17113 -848 1162 0


c  2-1 --> 1
c    (-b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧ -p_848) -> (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0)
c  in CNF:
c     b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_2
c     b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_1
c     b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨  b^{53, 17}_0
c  in DIMACS:
 17111 -17112  17113  848 -17114 0
 17111 -17112  17113  848 -17115 0
 17111 -17112  17113  848  17116 0

c  1-1 --> 0
c    (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0 ∧ -p_848) -> (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧ -b^{53, 17}_0)
c  in CNF:
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_2
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_1
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_0
c  in DIMACS:
 17111  17112 -17113  848 -17114 0
 17111  17112 -17113  848 -17115 0
 17111  17112 -17113  848 -17116 0

c  0-1 --> -1
c    (-b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧ -p_848) -> ( b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0)
c  in CNF:
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨  b^{53, 17}_2
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_1
c     b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨  b^{53, 17}_0
c  in DIMACS:
 17111  17112  17113  848  17114 0
 17111  17112  17113  848 -17115 0
 17111  17112  17113  848  17116 0

c  -1-1 --> -2
c    ( b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧  b^{53, 16}_0 ∧ -p_848) -> ( b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0)
c  in CNF:
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨  b^{53, 17}_2
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨  b^{53, 17}_1
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨  p_848 ∨ -b^{53, 17}_0
c  in DIMACS:
-17111  17112 -17113  848  17114 0
-17111  17112 -17113  848  17115 0
-17111  17112 -17113  848 -17116 0

c  -2-1 --> break 
c    ( b^{53, 16}_2 ∧  b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨  b^{53, 16}_0 ∨  p_848 ∨ break
c  in DIMACS:
-17111 -17112  17113  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 16}_2 ∧ -b^{53, 16}_1 ∧ -b^{53, 16}_0 ∧ true) 
c  in CNF:
c    -b^{53, 16}_2 ∨  b^{53, 16}_1 ∨  b^{53, 16}_0 ∨ false 
c  in DIMACS:
-17111  17112  17113  0

c  3 does not represent an automaton state.
c    -(-b^{53, 16}_2 ∧  b^{53, 16}_1 ∧  b^{53, 16}_0 ∧ true) 
c  in CNF:
c     b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ false 
c  in DIMACS:
 17111 -17112 -17113  0
c  -3 does not represent an automaton state.
c    -( b^{53, 16}_2 ∧  b^{53, 16}_1 ∧  b^{53, 16}_0 ∧ true) 
c  in CNF:
c    -b^{53, 16}_2 ∨ -b^{53, 16}_1 ∨ -b^{53, 16}_0 ∨ false 
c  in DIMACS:
-17111 -17112 -17113  0

c i = 17
c  -2+1 --> -1
c    ( b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧  p_901) -> ( b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0)
c  in CNF:
c    -b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨  b^{53, 18}_2
c    -b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_1
c    -b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨  b^{53, 18}_0
c  in DIMACS:
-17114 -17115  17116 -901  17117 0
-17114 -17115  17116 -901 -17118 0
-17114 -17115  17116 -901  17119 0

c  -1+1 --> 0
c    ( b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0 ∧  p_901) -> (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧ -b^{53, 18}_0)
c  in CNF:
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_2
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_1
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_0
c  in DIMACS:
-17114  17115 -17116 -901 -17117 0
-17114  17115 -17116 -901 -17118 0
-17114  17115 -17116 -901 -17119 0

c  0+1 --> 1
c    (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧  p_901) -> (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0)
c  in CNF:
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_2
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_1
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨  b^{53, 18}_0
c  in DIMACS:
 17114  17115  17116 -901 -17117 0
 17114  17115  17116 -901 -17118 0
 17114  17115  17116 -901  17119 0

c  1+1 --> 2
c    (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0 ∧  p_901) -> (-b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0)
c  in CNF:
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_2
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨  b^{53, 18}_1
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ -p_901 ∨ -b^{53, 18}_0
c  in DIMACS:
 17114  17115 -17116 -901 -17117 0
 17114  17115 -17116 -901  17118 0
 17114  17115 -17116 -901 -17119 0

c  2+1 --> break 
c    (-b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧  p_901) -> break
c  in CNF:
c     b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ -p_901 ∨ break
c  in DIMACS:
 17114 -17115  17116 -901 1162 0


c  2-1 --> 1
c    (-b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧ -p_901) -> (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0)
c  in CNF:
c     b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_2
c     b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_1
c     b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨  b^{53, 18}_0
c  in DIMACS:
 17114 -17115  17116  901 -17117 0
 17114 -17115  17116  901 -17118 0
 17114 -17115  17116  901  17119 0

c  1-1 --> 0
c    (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0 ∧ -p_901) -> (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧ -b^{53, 18}_0)
c  in CNF:
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_2
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_1
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_0
c  in DIMACS:
 17114  17115 -17116  901 -17117 0
 17114  17115 -17116  901 -17118 0
 17114  17115 -17116  901 -17119 0

c  0-1 --> -1
c    (-b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧ -p_901) -> ( b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0)
c  in CNF:
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨  b^{53, 18}_2
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_1
c     b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨  b^{53, 18}_0
c  in DIMACS:
 17114  17115  17116  901  17117 0
 17114  17115  17116  901 -17118 0
 17114  17115  17116  901  17119 0

c  -1-1 --> -2
c    ( b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧  b^{53, 17}_0 ∧ -p_901) -> ( b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0)
c  in CNF:
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨  b^{53, 18}_2
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨  b^{53, 18}_1
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨  p_901 ∨ -b^{53, 18}_0
c  in DIMACS:
-17114  17115 -17116  901  17117 0
-17114  17115 -17116  901  17118 0
-17114  17115 -17116  901 -17119 0

c  -2-1 --> break 
c    ( b^{53, 17}_2 ∧  b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧ -p_901) -> break
c  in CNF:
c    -b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨  b^{53, 17}_0 ∨  p_901 ∨ break
c  in DIMACS:
-17114 -17115  17116  901 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 17}_2 ∧ -b^{53, 17}_1 ∧ -b^{53, 17}_0 ∧ true) 
c  in CNF:
c    -b^{53, 17}_2 ∨  b^{53, 17}_1 ∨  b^{53, 17}_0 ∨ false 
c  in DIMACS:
-17114  17115  17116  0

c  3 does not represent an automaton state.
c    -(-b^{53, 17}_2 ∧  b^{53, 17}_1 ∧  b^{53, 17}_0 ∧ true) 
c  in CNF:
c     b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ false 
c  in DIMACS:
 17114 -17115 -17116  0
c  -3 does not represent an automaton state.
c    -( b^{53, 17}_2 ∧  b^{53, 17}_1 ∧  b^{53, 17}_0 ∧ true) 
c  in CNF:
c    -b^{53, 17}_2 ∨ -b^{53, 17}_1 ∨ -b^{53, 17}_0 ∨ false 
c  in DIMACS:
-17114 -17115 -17116  0

c i = 18
c  -2+1 --> -1
c    ( b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧  p_954) -> ( b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0)
c  in CNF:
c    -b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨  b^{53, 19}_2
c    -b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_1
c    -b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨  b^{53, 19}_0
c  in DIMACS:
-17117 -17118  17119 -954  17120 0
-17117 -17118  17119 -954 -17121 0
-17117 -17118  17119 -954  17122 0

c  -1+1 --> 0
c    ( b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0 ∧  p_954) -> (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧ -b^{53, 19}_0)
c  in CNF:
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_2
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_1
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_0
c  in DIMACS:
-17117  17118 -17119 -954 -17120 0
-17117  17118 -17119 -954 -17121 0
-17117  17118 -17119 -954 -17122 0

c  0+1 --> 1
c    (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧  p_954) -> (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0)
c  in CNF:
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_2
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_1
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨  b^{53, 19}_0
c  in DIMACS:
 17117  17118  17119 -954 -17120 0
 17117  17118  17119 -954 -17121 0
 17117  17118  17119 -954  17122 0

c  1+1 --> 2
c    (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0 ∧  p_954) -> (-b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0)
c  in CNF:
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_2
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨  b^{53, 19}_1
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ -p_954 ∨ -b^{53, 19}_0
c  in DIMACS:
 17117  17118 -17119 -954 -17120 0
 17117  17118 -17119 -954  17121 0
 17117  17118 -17119 -954 -17122 0

c  2+1 --> break 
c    (-b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧  p_954) -> break
c  in CNF:
c     b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 17117 -17118  17119 -954 1162 0


c  2-1 --> 1
c    (-b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧ -p_954) -> (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0)
c  in CNF:
c     b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_2
c     b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_1
c     b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨  b^{53, 19}_0
c  in DIMACS:
 17117 -17118  17119  954 -17120 0
 17117 -17118  17119  954 -17121 0
 17117 -17118  17119  954  17122 0

c  1-1 --> 0
c    (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0 ∧ -p_954) -> (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧ -b^{53, 19}_0)
c  in CNF:
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_2
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_1
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_0
c  in DIMACS:
 17117  17118 -17119  954 -17120 0
 17117  17118 -17119  954 -17121 0
 17117  17118 -17119  954 -17122 0

c  0-1 --> -1
c    (-b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧ -p_954) -> ( b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0)
c  in CNF:
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨  b^{53, 19}_2
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_1
c     b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨  b^{53, 19}_0
c  in DIMACS:
 17117  17118  17119  954  17120 0
 17117  17118  17119  954 -17121 0
 17117  17118  17119  954  17122 0

c  -1-1 --> -2
c    ( b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧  b^{53, 18}_0 ∧ -p_954) -> ( b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0)
c  in CNF:
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨  b^{53, 19}_2
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨  b^{53, 19}_1
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨  p_954 ∨ -b^{53, 19}_0
c  in DIMACS:
-17117  17118 -17119  954  17120 0
-17117  17118 -17119  954  17121 0
-17117  17118 -17119  954 -17122 0

c  -2-1 --> break 
c    ( b^{53, 18}_2 ∧  b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨  b^{53, 18}_0 ∨  p_954 ∨ break
c  in DIMACS:
-17117 -17118  17119  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 18}_2 ∧ -b^{53, 18}_1 ∧ -b^{53, 18}_0 ∧ true) 
c  in CNF:
c    -b^{53, 18}_2 ∨  b^{53, 18}_1 ∨  b^{53, 18}_0 ∨ false 
c  in DIMACS:
-17117  17118  17119  0

c  3 does not represent an automaton state.
c    -(-b^{53, 18}_2 ∧  b^{53, 18}_1 ∧  b^{53, 18}_0 ∧ true) 
c  in CNF:
c     b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ false 
c  in DIMACS:
 17117 -17118 -17119  0
c  -3 does not represent an automaton state.
c    -( b^{53, 18}_2 ∧  b^{53, 18}_1 ∧  b^{53, 18}_0 ∧ true) 
c  in CNF:
c    -b^{53, 18}_2 ∨ -b^{53, 18}_1 ∨ -b^{53, 18}_0 ∨ false 
c  in DIMACS:
-17117 -17118 -17119  0

c i = 19
c  -2+1 --> -1
c    ( b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧  p_1007) -> ( b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0)
c  in CNF:
c    -b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨  b^{53, 20}_2
c    -b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_1
c    -b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨  b^{53, 20}_0
c  in DIMACS:
-17120 -17121  17122 -1007  17123 0
-17120 -17121  17122 -1007 -17124 0
-17120 -17121  17122 -1007  17125 0

c  -1+1 --> 0
c    ( b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0 ∧  p_1007) -> (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧ -b^{53, 20}_0)
c  in CNF:
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_2
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_1
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_0
c  in DIMACS:
-17120  17121 -17122 -1007 -17123 0
-17120  17121 -17122 -1007 -17124 0
-17120  17121 -17122 -1007 -17125 0

c  0+1 --> 1
c    (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧  p_1007) -> (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0)
c  in CNF:
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_2
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_1
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨  b^{53, 20}_0
c  in DIMACS:
 17120  17121  17122 -1007 -17123 0
 17120  17121  17122 -1007 -17124 0
 17120  17121  17122 -1007  17125 0

c  1+1 --> 2
c    (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0 ∧  p_1007) -> (-b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0)
c  in CNF:
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_2
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨  b^{53, 20}_1
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ -p_1007 ∨ -b^{53, 20}_0
c  in DIMACS:
 17120  17121 -17122 -1007 -17123 0
 17120  17121 -17122 -1007  17124 0
 17120  17121 -17122 -1007 -17125 0

c  2+1 --> break 
c    (-b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧  p_1007) -> break
c  in CNF:
c     b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ -p_1007 ∨ break
c  in DIMACS:
 17120 -17121  17122 -1007 1162 0


c  2-1 --> 1
c    (-b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧ -p_1007) -> (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0)
c  in CNF:
c     b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_2
c     b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_1
c     b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨  b^{53, 20}_0
c  in DIMACS:
 17120 -17121  17122  1007 -17123 0
 17120 -17121  17122  1007 -17124 0
 17120 -17121  17122  1007  17125 0

c  1-1 --> 0
c    (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0 ∧ -p_1007) -> (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧ -b^{53, 20}_0)
c  in CNF:
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_2
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_1
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_0
c  in DIMACS:
 17120  17121 -17122  1007 -17123 0
 17120  17121 -17122  1007 -17124 0
 17120  17121 -17122  1007 -17125 0

c  0-1 --> -1
c    (-b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧ -p_1007) -> ( b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0)
c  in CNF:
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨  b^{53, 20}_2
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_1
c     b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨  b^{53, 20}_0
c  in DIMACS:
 17120  17121  17122  1007  17123 0
 17120  17121  17122  1007 -17124 0
 17120  17121  17122  1007  17125 0

c  -1-1 --> -2
c    ( b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧  b^{53, 19}_0 ∧ -p_1007) -> ( b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0)
c  in CNF:
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨  b^{53, 20}_2
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨  b^{53, 20}_1
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨  p_1007 ∨ -b^{53, 20}_0
c  in DIMACS:
-17120  17121 -17122  1007  17123 0
-17120  17121 -17122  1007  17124 0
-17120  17121 -17122  1007 -17125 0

c  -2-1 --> break 
c    ( b^{53, 19}_2 ∧  b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧ -p_1007) -> break
c  in CNF:
c    -b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨  b^{53, 19}_0 ∨  p_1007 ∨ break
c  in DIMACS:
-17120 -17121  17122  1007 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 19}_2 ∧ -b^{53, 19}_1 ∧ -b^{53, 19}_0 ∧ true) 
c  in CNF:
c    -b^{53, 19}_2 ∨  b^{53, 19}_1 ∨  b^{53, 19}_0 ∨ false 
c  in DIMACS:
-17120  17121  17122  0

c  3 does not represent an automaton state.
c    -(-b^{53, 19}_2 ∧  b^{53, 19}_1 ∧  b^{53, 19}_0 ∧ true) 
c  in CNF:
c     b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ false 
c  in DIMACS:
 17120 -17121 -17122  0
c  -3 does not represent an automaton state.
c    -( b^{53, 19}_2 ∧  b^{53, 19}_1 ∧  b^{53, 19}_0 ∧ true) 
c  in CNF:
c    -b^{53, 19}_2 ∨ -b^{53, 19}_1 ∨ -b^{53, 19}_0 ∨ false 
c  in DIMACS:
-17120 -17121 -17122  0

c i = 20
c  -2+1 --> -1
c    ( b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧  p_1060) -> ( b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0)
c  in CNF:
c    -b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨  b^{53, 21}_2
c    -b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_1
c    -b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨  b^{53, 21}_0
c  in DIMACS:
-17123 -17124  17125 -1060  17126 0
-17123 -17124  17125 -1060 -17127 0
-17123 -17124  17125 -1060  17128 0

c  -1+1 --> 0
c    ( b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0 ∧  p_1060) -> (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧ -b^{53, 21}_0)
c  in CNF:
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_2
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_1
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_0
c  in DIMACS:
-17123  17124 -17125 -1060 -17126 0
-17123  17124 -17125 -1060 -17127 0
-17123  17124 -17125 -1060 -17128 0

c  0+1 --> 1
c    (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧  p_1060) -> (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0)
c  in CNF:
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_2
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_1
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨  b^{53, 21}_0
c  in DIMACS:
 17123  17124  17125 -1060 -17126 0
 17123  17124  17125 -1060 -17127 0
 17123  17124  17125 -1060  17128 0

c  1+1 --> 2
c    (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0 ∧  p_1060) -> (-b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0)
c  in CNF:
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_2
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨  b^{53, 21}_1
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ -p_1060 ∨ -b^{53, 21}_0
c  in DIMACS:
 17123  17124 -17125 -1060 -17126 0
 17123  17124 -17125 -1060  17127 0
 17123  17124 -17125 -1060 -17128 0

c  2+1 --> break 
c    (-b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 17123 -17124  17125 -1060 1162 0


c  2-1 --> 1
c    (-b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧ -p_1060) -> (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0)
c  in CNF:
c     b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_2
c     b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_1
c     b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨  b^{53, 21}_0
c  in DIMACS:
 17123 -17124  17125  1060 -17126 0
 17123 -17124  17125  1060 -17127 0
 17123 -17124  17125  1060  17128 0

c  1-1 --> 0
c    (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0 ∧ -p_1060) -> (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧ -b^{53, 21}_0)
c  in CNF:
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_2
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_1
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_0
c  in DIMACS:
 17123  17124 -17125  1060 -17126 0
 17123  17124 -17125  1060 -17127 0
 17123  17124 -17125  1060 -17128 0

c  0-1 --> -1
c    (-b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧ -p_1060) -> ( b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0)
c  in CNF:
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨  b^{53, 21}_2
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_1
c     b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨  b^{53, 21}_0
c  in DIMACS:
 17123  17124  17125  1060  17126 0
 17123  17124  17125  1060 -17127 0
 17123  17124  17125  1060  17128 0

c  -1-1 --> -2
c    ( b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧  b^{53, 20}_0 ∧ -p_1060) -> ( b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0)
c  in CNF:
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨  b^{53, 21}_2
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨  b^{53, 21}_1
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨  p_1060 ∨ -b^{53, 21}_0
c  in DIMACS:
-17123  17124 -17125  1060  17126 0
-17123  17124 -17125  1060  17127 0
-17123  17124 -17125  1060 -17128 0

c  -2-1 --> break 
c    ( b^{53, 20}_2 ∧  b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨  b^{53, 20}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-17123 -17124  17125  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 20}_2 ∧ -b^{53, 20}_1 ∧ -b^{53, 20}_0 ∧ true) 
c  in CNF:
c    -b^{53, 20}_2 ∨  b^{53, 20}_1 ∨  b^{53, 20}_0 ∨ false 
c  in DIMACS:
-17123  17124  17125  0

c  3 does not represent an automaton state.
c    -(-b^{53, 20}_2 ∧  b^{53, 20}_1 ∧  b^{53, 20}_0 ∧ true) 
c  in CNF:
c     b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ false 
c  in DIMACS:
 17123 -17124 -17125  0
c  -3 does not represent an automaton state.
c    -( b^{53, 20}_2 ∧  b^{53, 20}_1 ∧  b^{53, 20}_0 ∧ true) 
c  in CNF:
c    -b^{53, 20}_2 ∨ -b^{53, 20}_1 ∨ -b^{53, 20}_0 ∨ false 
c  in DIMACS:
-17123 -17124 -17125  0

c i = 21
c  -2+1 --> -1
c    ( b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧  p_1113) -> ( b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧  b^{53, 22}_0)
c  in CNF:
c    -b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨  b^{53, 22}_2
c    -b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_1
c    -b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨  b^{53, 22}_0
c  in DIMACS:
-17126 -17127  17128 -1113  17129 0
-17126 -17127  17128 -1113 -17130 0
-17126 -17127  17128 -1113  17131 0

c  -1+1 --> 0
c    ( b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0 ∧  p_1113) -> (-b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧ -b^{53, 22}_0)
c  in CNF:
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_2
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_1
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_0
c  in DIMACS:
-17126  17127 -17128 -1113 -17129 0
-17126  17127 -17128 -1113 -17130 0
-17126  17127 -17128 -1113 -17131 0

c  0+1 --> 1
c    (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧  p_1113) -> (-b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧  b^{53, 22}_0)
c  in CNF:
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_2
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_1
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨  b^{53, 22}_0
c  in DIMACS:
 17126  17127  17128 -1113 -17129 0
 17126  17127  17128 -1113 -17130 0
 17126  17127  17128 -1113  17131 0

c  1+1 --> 2
c    (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0 ∧  p_1113) -> (-b^{53, 22}_2 ∧  b^{53, 22}_1 ∧ -b^{53, 22}_0)
c  in CNF:
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_2
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨  b^{53, 22}_1
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ -p_1113 ∨ -b^{53, 22}_0
c  in DIMACS:
 17126  17127 -17128 -1113 -17129 0
 17126  17127 -17128 -1113  17130 0
 17126  17127 -17128 -1113 -17131 0

c  2+1 --> break 
c    (-b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 17126 -17127  17128 -1113 1162 0


c  2-1 --> 1
c    (-b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧ -p_1113) -> (-b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧  b^{53, 22}_0)
c  in CNF:
c     b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_2
c     b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_1
c     b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨  b^{53, 22}_0
c  in DIMACS:
 17126 -17127  17128  1113 -17129 0
 17126 -17127  17128  1113 -17130 0
 17126 -17127  17128  1113  17131 0

c  1-1 --> 0
c    (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0 ∧ -p_1113) -> (-b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧ -b^{53, 22}_0)
c  in CNF:
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_2
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_1
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_0
c  in DIMACS:
 17126  17127 -17128  1113 -17129 0
 17126  17127 -17128  1113 -17130 0
 17126  17127 -17128  1113 -17131 0

c  0-1 --> -1
c    (-b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧ -p_1113) -> ( b^{53, 22}_2 ∧ -b^{53, 22}_1 ∧  b^{53, 22}_0)
c  in CNF:
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨  b^{53, 22}_2
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_1
c     b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨  b^{53, 22}_0
c  in DIMACS:
 17126  17127  17128  1113  17129 0
 17126  17127  17128  1113 -17130 0
 17126  17127  17128  1113  17131 0

c  -1-1 --> -2
c    ( b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧  b^{53, 21}_0 ∧ -p_1113) -> ( b^{53, 22}_2 ∧  b^{53, 22}_1 ∧ -b^{53, 22}_0)
c  in CNF:
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨  b^{53, 22}_2
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨  b^{53, 22}_1
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨  p_1113 ∨ -b^{53, 22}_0
c  in DIMACS:
-17126  17127 -17128  1113  17129 0
-17126  17127 -17128  1113  17130 0
-17126  17127 -17128  1113 -17131 0

c  -2-1 --> break 
c    ( b^{53, 21}_2 ∧  b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨  b^{53, 21}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-17126 -17127  17128  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{53, 21}_2 ∧ -b^{53, 21}_1 ∧ -b^{53, 21}_0 ∧ true) 
c  in CNF:
c    -b^{53, 21}_2 ∨  b^{53, 21}_1 ∨  b^{53, 21}_0 ∨ false 
c  in DIMACS:
-17126  17127  17128  0

c  3 does not represent an automaton state.
c    -(-b^{53, 21}_2 ∧  b^{53, 21}_1 ∧  b^{53, 21}_0 ∧ true) 
c  in CNF:
c     b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ false 
c  in DIMACS:
 17126 -17127 -17128  0
c  -3 does not represent an automaton state.
c    -( b^{53, 21}_2 ∧  b^{53, 21}_1 ∧  b^{53, 21}_0 ∧ true) 
c  in CNF:
c    -b^{53, 21}_2 ∨ -b^{53, 21}_1 ∨ -b^{53, 21}_0 ∨ false 
c  in DIMACS:
-17126 -17127 -17128  0

c INIT for k = 54
c    -b^{54, 1}_2
c    -b^{54, 1}_1
c    -b^{54, 1}_0
c  in DIMACS:
-17132 0
-17133 0
-17134 0

c Transitions for k = 54
c i = 1
c  -2+1 --> -1
c    ( b^{54, 1}_2 ∧  b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧  p_54) -> ( b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0)
c  in CNF:
c    -b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨  b^{54, 2}_2
c    -b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_1
c    -b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨  b^{54, 2}_0
c  in DIMACS:
-17132 -17133  17134 -54  17135 0
-17132 -17133  17134 -54 -17136 0
-17132 -17133  17134 -54  17137 0

c  -1+1 --> 0
c    ( b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧  b^{54, 1}_0 ∧  p_54) -> (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧ -b^{54, 2}_0)
c  in CNF:
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_2
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_1
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_0
c  in DIMACS:
-17132  17133 -17134 -54 -17135 0
-17132  17133 -17134 -54 -17136 0
-17132  17133 -17134 -54 -17137 0

c  0+1 --> 1
c    (-b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧  p_54) -> (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0)
c  in CNF:
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_2
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_1
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨  b^{54, 2}_0
c  in DIMACS:
 17132  17133  17134 -54 -17135 0
 17132  17133  17134 -54 -17136 0
 17132  17133  17134 -54  17137 0

c  1+1 --> 2
c    (-b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧  b^{54, 1}_0 ∧  p_54) -> (-b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0)
c  in CNF:
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_2
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨  b^{54, 2}_1
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ -p_54 ∨ -b^{54, 2}_0
c  in DIMACS:
 17132  17133 -17134 -54 -17135 0
 17132  17133 -17134 -54  17136 0
 17132  17133 -17134 -54 -17137 0

c  2+1 --> break 
c    (-b^{54, 1}_2 ∧  b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧  p_54) -> break
c  in CNF:
c     b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ -p_54 ∨ break
c  in DIMACS:
 17132 -17133  17134 -54 1162 0


c  2-1 --> 1
c    (-b^{54, 1}_2 ∧  b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧ -p_54) -> (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0)
c  in CNF:
c     b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_2
c     b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_1
c     b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨  b^{54, 2}_0
c  in DIMACS:
 17132 -17133  17134  54 -17135 0
 17132 -17133  17134  54 -17136 0
 17132 -17133  17134  54  17137 0

c  1-1 --> 0
c    (-b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧  b^{54, 1}_0 ∧ -p_54) -> (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧ -b^{54, 2}_0)
c  in CNF:
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_2
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_1
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_0
c  in DIMACS:
 17132  17133 -17134  54 -17135 0
 17132  17133 -17134  54 -17136 0
 17132  17133 -17134  54 -17137 0

c  0-1 --> -1
c    (-b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧ -p_54) -> ( b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0)
c  in CNF:
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨  b^{54, 2}_2
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_1
c     b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨  b^{54, 2}_0
c  in DIMACS:
 17132  17133  17134  54  17135 0
 17132  17133  17134  54 -17136 0
 17132  17133  17134  54  17137 0

c  -1-1 --> -2
c    ( b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧  b^{54, 1}_0 ∧ -p_54) -> ( b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0)
c  in CNF:
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨  b^{54, 2}_2
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨  b^{54, 2}_1
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨  p_54 ∨ -b^{54, 2}_0
c  in DIMACS:
-17132  17133 -17134  54  17135 0
-17132  17133 -17134  54  17136 0
-17132  17133 -17134  54 -17137 0

c  -2-1 --> break 
c    ( b^{54, 1}_2 ∧  b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧ -p_54) -> break
c  in CNF:
c    -b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨  b^{54, 1}_0 ∨  p_54 ∨ break
c  in DIMACS:
-17132 -17133  17134  54 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 1}_2 ∧ -b^{54, 1}_1 ∧ -b^{54, 1}_0 ∧ true) 
c  in CNF:
c    -b^{54, 1}_2 ∨  b^{54, 1}_1 ∨  b^{54, 1}_0 ∨ false 
c  in DIMACS:
-17132  17133  17134  0

c  3 does not represent an automaton state.
c    -(-b^{54, 1}_2 ∧  b^{54, 1}_1 ∧  b^{54, 1}_0 ∧ true) 
c  in CNF:
c     b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ false 
c  in DIMACS:
 17132 -17133 -17134  0
c  -3 does not represent an automaton state.
c    -( b^{54, 1}_2 ∧  b^{54, 1}_1 ∧  b^{54, 1}_0 ∧ true) 
c  in CNF:
c    -b^{54, 1}_2 ∨ -b^{54, 1}_1 ∨ -b^{54, 1}_0 ∨ false 
c  in DIMACS:
-17132 -17133 -17134  0

c i = 2
c  -2+1 --> -1
c    ( b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧  p_108) -> ( b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0)
c  in CNF:
c    -b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨  b^{54, 3}_2
c    -b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_1
c    -b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨  b^{54, 3}_0
c  in DIMACS:
-17135 -17136  17137 -108  17138 0
-17135 -17136  17137 -108 -17139 0
-17135 -17136  17137 -108  17140 0

c  -1+1 --> 0
c    ( b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0 ∧  p_108) -> (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧ -b^{54, 3}_0)
c  in CNF:
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_2
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_1
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_0
c  in DIMACS:
-17135  17136 -17137 -108 -17138 0
-17135  17136 -17137 -108 -17139 0
-17135  17136 -17137 -108 -17140 0

c  0+1 --> 1
c    (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧  p_108) -> (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0)
c  in CNF:
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_2
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_1
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨  b^{54, 3}_0
c  in DIMACS:
 17135  17136  17137 -108 -17138 0
 17135  17136  17137 -108 -17139 0
 17135  17136  17137 -108  17140 0

c  1+1 --> 2
c    (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0 ∧  p_108) -> (-b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0)
c  in CNF:
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_2
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨  b^{54, 3}_1
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ -p_108 ∨ -b^{54, 3}_0
c  in DIMACS:
 17135  17136 -17137 -108 -17138 0
 17135  17136 -17137 -108  17139 0
 17135  17136 -17137 -108 -17140 0

c  2+1 --> break 
c    (-b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧  p_108) -> break
c  in CNF:
c     b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 17135 -17136  17137 -108 1162 0


c  2-1 --> 1
c    (-b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧ -p_108) -> (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0)
c  in CNF:
c     b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_2
c     b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_1
c     b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨  b^{54, 3}_0
c  in DIMACS:
 17135 -17136  17137  108 -17138 0
 17135 -17136  17137  108 -17139 0
 17135 -17136  17137  108  17140 0

c  1-1 --> 0
c    (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0 ∧ -p_108) -> (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧ -b^{54, 3}_0)
c  in CNF:
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_2
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_1
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_0
c  in DIMACS:
 17135  17136 -17137  108 -17138 0
 17135  17136 -17137  108 -17139 0
 17135  17136 -17137  108 -17140 0

c  0-1 --> -1
c    (-b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧ -p_108) -> ( b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0)
c  in CNF:
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨  b^{54, 3}_2
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_1
c     b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨  b^{54, 3}_0
c  in DIMACS:
 17135  17136  17137  108  17138 0
 17135  17136  17137  108 -17139 0
 17135  17136  17137  108  17140 0

c  -1-1 --> -2
c    ( b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧  b^{54, 2}_0 ∧ -p_108) -> ( b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0)
c  in CNF:
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨  b^{54, 3}_2
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨  b^{54, 3}_1
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨  p_108 ∨ -b^{54, 3}_0
c  in DIMACS:
-17135  17136 -17137  108  17138 0
-17135  17136 -17137  108  17139 0
-17135  17136 -17137  108 -17140 0

c  -2-1 --> break 
c    ( b^{54, 2}_2 ∧  b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨  b^{54, 2}_0 ∨  p_108 ∨ break
c  in DIMACS:
-17135 -17136  17137  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 2}_2 ∧ -b^{54, 2}_1 ∧ -b^{54, 2}_0 ∧ true) 
c  in CNF:
c    -b^{54, 2}_2 ∨  b^{54, 2}_1 ∨  b^{54, 2}_0 ∨ false 
c  in DIMACS:
-17135  17136  17137  0

c  3 does not represent an automaton state.
c    -(-b^{54, 2}_2 ∧  b^{54, 2}_1 ∧  b^{54, 2}_0 ∧ true) 
c  in CNF:
c     b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ false 
c  in DIMACS:
 17135 -17136 -17137  0
c  -3 does not represent an automaton state.
c    -( b^{54, 2}_2 ∧  b^{54, 2}_1 ∧  b^{54, 2}_0 ∧ true) 
c  in CNF:
c    -b^{54, 2}_2 ∨ -b^{54, 2}_1 ∨ -b^{54, 2}_0 ∨ false 
c  in DIMACS:
-17135 -17136 -17137  0

c i = 3
c  -2+1 --> -1
c    ( b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧  p_162) -> ( b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0)
c  in CNF:
c    -b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨  b^{54, 4}_2
c    -b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_1
c    -b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨  b^{54, 4}_0
c  in DIMACS:
-17138 -17139  17140 -162  17141 0
-17138 -17139  17140 -162 -17142 0
-17138 -17139  17140 -162  17143 0

c  -1+1 --> 0
c    ( b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0 ∧  p_162) -> (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧ -b^{54, 4}_0)
c  in CNF:
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_2
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_1
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_0
c  in DIMACS:
-17138  17139 -17140 -162 -17141 0
-17138  17139 -17140 -162 -17142 0
-17138  17139 -17140 -162 -17143 0

c  0+1 --> 1
c    (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧  p_162) -> (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0)
c  in CNF:
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_2
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_1
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨  b^{54, 4}_0
c  in DIMACS:
 17138  17139  17140 -162 -17141 0
 17138  17139  17140 -162 -17142 0
 17138  17139  17140 -162  17143 0

c  1+1 --> 2
c    (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0 ∧  p_162) -> (-b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0)
c  in CNF:
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_2
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨  b^{54, 4}_1
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ -p_162 ∨ -b^{54, 4}_0
c  in DIMACS:
 17138  17139 -17140 -162 -17141 0
 17138  17139 -17140 -162  17142 0
 17138  17139 -17140 -162 -17143 0

c  2+1 --> break 
c    (-b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧  p_162) -> break
c  in CNF:
c     b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 17138 -17139  17140 -162 1162 0


c  2-1 --> 1
c    (-b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧ -p_162) -> (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0)
c  in CNF:
c     b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_2
c     b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_1
c     b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨  b^{54, 4}_0
c  in DIMACS:
 17138 -17139  17140  162 -17141 0
 17138 -17139  17140  162 -17142 0
 17138 -17139  17140  162  17143 0

c  1-1 --> 0
c    (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0 ∧ -p_162) -> (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧ -b^{54, 4}_0)
c  in CNF:
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_2
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_1
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_0
c  in DIMACS:
 17138  17139 -17140  162 -17141 0
 17138  17139 -17140  162 -17142 0
 17138  17139 -17140  162 -17143 0

c  0-1 --> -1
c    (-b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧ -p_162) -> ( b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0)
c  in CNF:
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨  b^{54, 4}_2
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_1
c     b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨  b^{54, 4}_0
c  in DIMACS:
 17138  17139  17140  162  17141 0
 17138  17139  17140  162 -17142 0
 17138  17139  17140  162  17143 0

c  -1-1 --> -2
c    ( b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧  b^{54, 3}_0 ∧ -p_162) -> ( b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0)
c  in CNF:
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨  b^{54, 4}_2
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨  b^{54, 4}_1
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨  p_162 ∨ -b^{54, 4}_0
c  in DIMACS:
-17138  17139 -17140  162  17141 0
-17138  17139 -17140  162  17142 0
-17138  17139 -17140  162 -17143 0

c  -2-1 --> break 
c    ( b^{54, 3}_2 ∧  b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨  b^{54, 3}_0 ∨  p_162 ∨ break
c  in DIMACS:
-17138 -17139  17140  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 3}_2 ∧ -b^{54, 3}_1 ∧ -b^{54, 3}_0 ∧ true) 
c  in CNF:
c    -b^{54, 3}_2 ∨  b^{54, 3}_1 ∨  b^{54, 3}_0 ∨ false 
c  in DIMACS:
-17138  17139  17140  0

c  3 does not represent an automaton state.
c    -(-b^{54, 3}_2 ∧  b^{54, 3}_1 ∧  b^{54, 3}_0 ∧ true) 
c  in CNF:
c     b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ false 
c  in DIMACS:
 17138 -17139 -17140  0
c  -3 does not represent an automaton state.
c    -( b^{54, 3}_2 ∧  b^{54, 3}_1 ∧  b^{54, 3}_0 ∧ true) 
c  in CNF:
c    -b^{54, 3}_2 ∨ -b^{54, 3}_1 ∨ -b^{54, 3}_0 ∨ false 
c  in DIMACS:
-17138 -17139 -17140  0

c i = 4
c  -2+1 --> -1
c    ( b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧  p_216) -> ( b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0)
c  in CNF:
c    -b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨  b^{54, 5}_2
c    -b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_1
c    -b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨  b^{54, 5}_0
c  in DIMACS:
-17141 -17142  17143 -216  17144 0
-17141 -17142  17143 -216 -17145 0
-17141 -17142  17143 -216  17146 0

c  -1+1 --> 0
c    ( b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0 ∧  p_216) -> (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧ -b^{54, 5}_0)
c  in CNF:
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_2
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_1
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_0
c  in DIMACS:
-17141  17142 -17143 -216 -17144 0
-17141  17142 -17143 -216 -17145 0
-17141  17142 -17143 -216 -17146 0

c  0+1 --> 1
c    (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧  p_216) -> (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0)
c  in CNF:
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_2
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_1
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨  b^{54, 5}_0
c  in DIMACS:
 17141  17142  17143 -216 -17144 0
 17141  17142  17143 -216 -17145 0
 17141  17142  17143 -216  17146 0

c  1+1 --> 2
c    (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0 ∧  p_216) -> (-b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0)
c  in CNF:
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_2
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨  b^{54, 5}_1
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ -p_216 ∨ -b^{54, 5}_0
c  in DIMACS:
 17141  17142 -17143 -216 -17144 0
 17141  17142 -17143 -216  17145 0
 17141  17142 -17143 -216 -17146 0

c  2+1 --> break 
c    (-b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧  p_216) -> break
c  in CNF:
c     b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 17141 -17142  17143 -216 1162 0


c  2-1 --> 1
c    (-b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧ -p_216) -> (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0)
c  in CNF:
c     b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_2
c     b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_1
c     b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨  b^{54, 5}_0
c  in DIMACS:
 17141 -17142  17143  216 -17144 0
 17141 -17142  17143  216 -17145 0
 17141 -17142  17143  216  17146 0

c  1-1 --> 0
c    (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0 ∧ -p_216) -> (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧ -b^{54, 5}_0)
c  in CNF:
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_2
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_1
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_0
c  in DIMACS:
 17141  17142 -17143  216 -17144 0
 17141  17142 -17143  216 -17145 0
 17141  17142 -17143  216 -17146 0

c  0-1 --> -1
c    (-b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧ -p_216) -> ( b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0)
c  in CNF:
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨  b^{54, 5}_2
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_1
c     b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨  b^{54, 5}_0
c  in DIMACS:
 17141  17142  17143  216  17144 0
 17141  17142  17143  216 -17145 0
 17141  17142  17143  216  17146 0

c  -1-1 --> -2
c    ( b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧  b^{54, 4}_0 ∧ -p_216) -> ( b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0)
c  in CNF:
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨  b^{54, 5}_2
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨  b^{54, 5}_1
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨  p_216 ∨ -b^{54, 5}_0
c  in DIMACS:
-17141  17142 -17143  216  17144 0
-17141  17142 -17143  216  17145 0
-17141  17142 -17143  216 -17146 0

c  -2-1 --> break 
c    ( b^{54, 4}_2 ∧  b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨  b^{54, 4}_0 ∨  p_216 ∨ break
c  in DIMACS:
-17141 -17142  17143  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 4}_2 ∧ -b^{54, 4}_1 ∧ -b^{54, 4}_0 ∧ true) 
c  in CNF:
c    -b^{54, 4}_2 ∨  b^{54, 4}_1 ∨  b^{54, 4}_0 ∨ false 
c  in DIMACS:
-17141  17142  17143  0

c  3 does not represent an automaton state.
c    -(-b^{54, 4}_2 ∧  b^{54, 4}_1 ∧  b^{54, 4}_0 ∧ true) 
c  in CNF:
c     b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ false 
c  in DIMACS:
 17141 -17142 -17143  0
c  -3 does not represent an automaton state.
c    -( b^{54, 4}_2 ∧  b^{54, 4}_1 ∧  b^{54, 4}_0 ∧ true) 
c  in CNF:
c    -b^{54, 4}_2 ∨ -b^{54, 4}_1 ∨ -b^{54, 4}_0 ∨ false 
c  in DIMACS:
-17141 -17142 -17143  0

c i = 5
c  -2+1 --> -1
c    ( b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧  p_270) -> ( b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0)
c  in CNF:
c    -b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨  b^{54, 6}_2
c    -b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_1
c    -b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨  b^{54, 6}_0
c  in DIMACS:
-17144 -17145  17146 -270  17147 0
-17144 -17145  17146 -270 -17148 0
-17144 -17145  17146 -270  17149 0

c  -1+1 --> 0
c    ( b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0 ∧  p_270) -> (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧ -b^{54, 6}_0)
c  in CNF:
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_2
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_1
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_0
c  in DIMACS:
-17144  17145 -17146 -270 -17147 0
-17144  17145 -17146 -270 -17148 0
-17144  17145 -17146 -270 -17149 0

c  0+1 --> 1
c    (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧  p_270) -> (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0)
c  in CNF:
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_2
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_1
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨  b^{54, 6}_0
c  in DIMACS:
 17144  17145  17146 -270 -17147 0
 17144  17145  17146 -270 -17148 0
 17144  17145  17146 -270  17149 0

c  1+1 --> 2
c    (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0 ∧  p_270) -> (-b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0)
c  in CNF:
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_2
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨  b^{54, 6}_1
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ -p_270 ∨ -b^{54, 6}_0
c  in DIMACS:
 17144  17145 -17146 -270 -17147 0
 17144  17145 -17146 -270  17148 0
 17144  17145 -17146 -270 -17149 0

c  2+1 --> break 
c    (-b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧  p_270) -> break
c  in CNF:
c     b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 17144 -17145  17146 -270 1162 0


c  2-1 --> 1
c    (-b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧ -p_270) -> (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0)
c  in CNF:
c     b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_2
c     b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_1
c     b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨  b^{54, 6}_0
c  in DIMACS:
 17144 -17145  17146  270 -17147 0
 17144 -17145  17146  270 -17148 0
 17144 -17145  17146  270  17149 0

c  1-1 --> 0
c    (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0 ∧ -p_270) -> (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧ -b^{54, 6}_0)
c  in CNF:
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_2
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_1
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_0
c  in DIMACS:
 17144  17145 -17146  270 -17147 0
 17144  17145 -17146  270 -17148 0
 17144  17145 -17146  270 -17149 0

c  0-1 --> -1
c    (-b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧ -p_270) -> ( b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0)
c  in CNF:
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨  b^{54, 6}_2
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_1
c     b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨  b^{54, 6}_0
c  in DIMACS:
 17144  17145  17146  270  17147 0
 17144  17145  17146  270 -17148 0
 17144  17145  17146  270  17149 0

c  -1-1 --> -2
c    ( b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧  b^{54, 5}_0 ∧ -p_270) -> ( b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0)
c  in CNF:
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨  b^{54, 6}_2
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨  b^{54, 6}_1
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨  p_270 ∨ -b^{54, 6}_0
c  in DIMACS:
-17144  17145 -17146  270  17147 0
-17144  17145 -17146  270  17148 0
-17144  17145 -17146  270 -17149 0

c  -2-1 --> break 
c    ( b^{54, 5}_2 ∧  b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨  b^{54, 5}_0 ∨  p_270 ∨ break
c  in DIMACS:
-17144 -17145  17146  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 5}_2 ∧ -b^{54, 5}_1 ∧ -b^{54, 5}_0 ∧ true) 
c  in CNF:
c    -b^{54, 5}_2 ∨  b^{54, 5}_1 ∨  b^{54, 5}_0 ∨ false 
c  in DIMACS:
-17144  17145  17146  0

c  3 does not represent an automaton state.
c    -(-b^{54, 5}_2 ∧  b^{54, 5}_1 ∧  b^{54, 5}_0 ∧ true) 
c  in CNF:
c     b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ false 
c  in DIMACS:
 17144 -17145 -17146  0
c  -3 does not represent an automaton state.
c    -( b^{54, 5}_2 ∧  b^{54, 5}_1 ∧  b^{54, 5}_0 ∧ true) 
c  in CNF:
c    -b^{54, 5}_2 ∨ -b^{54, 5}_1 ∨ -b^{54, 5}_0 ∨ false 
c  in DIMACS:
-17144 -17145 -17146  0

c i = 6
c  -2+1 --> -1
c    ( b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧  p_324) -> ( b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0)
c  in CNF:
c    -b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨  b^{54, 7}_2
c    -b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_1
c    -b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨  b^{54, 7}_0
c  in DIMACS:
-17147 -17148  17149 -324  17150 0
-17147 -17148  17149 -324 -17151 0
-17147 -17148  17149 -324  17152 0

c  -1+1 --> 0
c    ( b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0 ∧  p_324) -> (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧ -b^{54, 7}_0)
c  in CNF:
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_2
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_1
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_0
c  in DIMACS:
-17147  17148 -17149 -324 -17150 0
-17147  17148 -17149 -324 -17151 0
-17147  17148 -17149 -324 -17152 0

c  0+1 --> 1
c    (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧  p_324) -> (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0)
c  in CNF:
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_2
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_1
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨  b^{54, 7}_0
c  in DIMACS:
 17147  17148  17149 -324 -17150 0
 17147  17148  17149 -324 -17151 0
 17147  17148  17149 -324  17152 0

c  1+1 --> 2
c    (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0 ∧  p_324) -> (-b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0)
c  in CNF:
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_2
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨  b^{54, 7}_1
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ -p_324 ∨ -b^{54, 7}_0
c  in DIMACS:
 17147  17148 -17149 -324 -17150 0
 17147  17148 -17149 -324  17151 0
 17147  17148 -17149 -324 -17152 0

c  2+1 --> break 
c    (-b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧  p_324) -> break
c  in CNF:
c     b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 17147 -17148  17149 -324 1162 0


c  2-1 --> 1
c    (-b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧ -p_324) -> (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0)
c  in CNF:
c     b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_2
c     b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_1
c     b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨  b^{54, 7}_0
c  in DIMACS:
 17147 -17148  17149  324 -17150 0
 17147 -17148  17149  324 -17151 0
 17147 -17148  17149  324  17152 0

c  1-1 --> 0
c    (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0 ∧ -p_324) -> (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧ -b^{54, 7}_0)
c  in CNF:
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_2
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_1
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_0
c  in DIMACS:
 17147  17148 -17149  324 -17150 0
 17147  17148 -17149  324 -17151 0
 17147  17148 -17149  324 -17152 0

c  0-1 --> -1
c    (-b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧ -p_324) -> ( b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0)
c  in CNF:
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨  b^{54, 7}_2
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_1
c     b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨  b^{54, 7}_0
c  in DIMACS:
 17147  17148  17149  324  17150 0
 17147  17148  17149  324 -17151 0
 17147  17148  17149  324  17152 0

c  -1-1 --> -2
c    ( b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧  b^{54, 6}_0 ∧ -p_324) -> ( b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0)
c  in CNF:
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨  b^{54, 7}_2
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨  b^{54, 7}_1
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨  p_324 ∨ -b^{54, 7}_0
c  in DIMACS:
-17147  17148 -17149  324  17150 0
-17147  17148 -17149  324  17151 0
-17147  17148 -17149  324 -17152 0

c  -2-1 --> break 
c    ( b^{54, 6}_2 ∧  b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨  b^{54, 6}_0 ∨  p_324 ∨ break
c  in DIMACS:
-17147 -17148  17149  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 6}_2 ∧ -b^{54, 6}_1 ∧ -b^{54, 6}_0 ∧ true) 
c  in CNF:
c    -b^{54, 6}_2 ∨  b^{54, 6}_1 ∨  b^{54, 6}_0 ∨ false 
c  in DIMACS:
-17147  17148  17149  0

c  3 does not represent an automaton state.
c    -(-b^{54, 6}_2 ∧  b^{54, 6}_1 ∧  b^{54, 6}_0 ∧ true) 
c  in CNF:
c     b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ false 
c  in DIMACS:
 17147 -17148 -17149  0
c  -3 does not represent an automaton state.
c    -( b^{54, 6}_2 ∧  b^{54, 6}_1 ∧  b^{54, 6}_0 ∧ true) 
c  in CNF:
c    -b^{54, 6}_2 ∨ -b^{54, 6}_1 ∨ -b^{54, 6}_0 ∨ false 
c  in DIMACS:
-17147 -17148 -17149  0

c i = 7
c  -2+1 --> -1
c    ( b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧  p_378) -> ( b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0)
c  in CNF:
c    -b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨  b^{54, 8}_2
c    -b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_1
c    -b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨  b^{54, 8}_0
c  in DIMACS:
-17150 -17151  17152 -378  17153 0
-17150 -17151  17152 -378 -17154 0
-17150 -17151  17152 -378  17155 0

c  -1+1 --> 0
c    ( b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0 ∧  p_378) -> (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧ -b^{54, 8}_0)
c  in CNF:
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_2
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_1
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_0
c  in DIMACS:
-17150  17151 -17152 -378 -17153 0
-17150  17151 -17152 -378 -17154 0
-17150  17151 -17152 -378 -17155 0

c  0+1 --> 1
c    (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧  p_378) -> (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0)
c  in CNF:
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_2
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_1
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨  b^{54, 8}_0
c  in DIMACS:
 17150  17151  17152 -378 -17153 0
 17150  17151  17152 -378 -17154 0
 17150  17151  17152 -378  17155 0

c  1+1 --> 2
c    (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0 ∧  p_378) -> (-b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0)
c  in CNF:
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_2
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨  b^{54, 8}_1
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ -p_378 ∨ -b^{54, 8}_0
c  in DIMACS:
 17150  17151 -17152 -378 -17153 0
 17150  17151 -17152 -378  17154 0
 17150  17151 -17152 -378 -17155 0

c  2+1 --> break 
c    (-b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧  p_378) -> break
c  in CNF:
c     b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 17150 -17151  17152 -378 1162 0


c  2-1 --> 1
c    (-b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧ -p_378) -> (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0)
c  in CNF:
c     b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_2
c     b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_1
c     b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨  b^{54, 8}_0
c  in DIMACS:
 17150 -17151  17152  378 -17153 0
 17150 -17151  17152  378 -17154 0
 17150 -17151  17152  378  17155 0

c  1-1 --> 0
c    (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0 ∧ -p_378) -> (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧ -b^{54, 8}_0)
c  in CNF:
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_2
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_1
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_0
c  in DIMACS:
 17150  17151 -17152  378 -17153 0
 17150  17151 -17152  378 -17154 0
 17150  17151 -17152  378 -17155 0

c  0-1 --> -1
c    (-b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧ -p_378) -> ( b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0)
c  in CNF:
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨  b^{54, 8}_2
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_1
c     b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨  b^{54, 8}_0
c  in DIMACS:
 17150  17151  17152  378  17153 0
 17150  17151  17152  378 -17154 0
 17150  17151  17152  378  17155 0

c  -1-1 --> -2
c    ( b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧  b^{54, 7}_0 ∧ -p_378) -> ( b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0)
c  in CNF:
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨  b^{54, 8}_2
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨  b^{54, 8}_1
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨  p_378 ∨ -b^{54, 8}_0
c  in DIMACS:
-17150  17151 -17152  378  17153 0
-17150  17151 -17152  378  17154 0
-17150  17151 -17152  378 -17155 0

c  -2-1 --> break 
c    ( b^{54, 7}_2 ∧  b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨  b^{54, 7}_0 ∨  p_378 ∨ break
c  in DIMACS:
-17150 -17151  17152  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 7}_2 ∧ -b^{54, 7}_1 ∧ -b^{54, 7}_0 ∧ true) 
c  in CNF:
c    -b^{54, 7}_2 ∨  b^{54, 7}_1 ∨  b^{54, 7}_0 ∨ false 
c  in DIMACS:
-17150  17151  17152  0

c  3 does not represent an automaton state.
c    -(-b^{54, 7}_2 ∧  b^{54, 7}_1 ∧  b^{54, 7}_0 ∧ true) 
c  in CNF:
c     b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ false 
c  in DIMACS:
 17150 -17151 -17152  0
c  -3 does not represent an automaton state.
c    -( b^{54, 7}_2 ∧  b^{54, 7}_1 ∧  b^{54, 7}_0 ∧ true) 
c  in CNF:
c    -b^{54, 7}_2 ∨ -b^{54, 7}_1 ∨ -b^{54, 7}_0 ∨ false 
c  in DIMACS:
-17150 -17151 -17152  0

c i = 8
c  -2+1 --> -1
c    ( b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧  p_432) -> ( b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0)
c  in CNF:
c    -b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨  b^{54, 9}_2
c    -b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_1
c    -b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨  b^{54, 9}_0
c  in DIMACS:
-17153 -17154  17155 -432  17156 0
-17153 -17154  17155 -432 -17157 0
-17153 -17154  17155 -432  17158 0

c  -1+1 --> 0
c    ( b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0 ∧  p_432) -> (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧ -b^{54, 9}_0)
c  in CNF:
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_2
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_1
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_0
c  in DIMACS:
-17153  17154 -17155 -432 -17156 0
-17153  17154 -17155 -432 -17157 0
-17153  17154 -17155 -432 -17158 0

c  0+1 --> 1
c    (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧  p_432) -> (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0)
c  in CNF:
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_2
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_1
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨  b^{54, 9}_0
c  in DIMACS:
 17153  17154  17155 -432 -17156 0
 17153  17154  17155 -432 -17157 0
 17153  17154  17155 -432  17158 0

c  1+1 --> 2
c    (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0 ∧  p_432) -> (-b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0)
c  in CNF:
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_2
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨  b^{54, 9}_1
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ -p_432 ∨ -b^{54, 9}_0
c  in DIMACS:
 17153  17154 -17155 -432 -17156 0
 17153  17154 -17155 -432  17157 0
 17153  17154 -17155 -432 -17158 0

c  2+1 --> break 
c    (-b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧  p_432) -> break
c  in CNF:
c     b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 17153 -17154  17155 -432 1162 0


c  2-1 --> 1
c    (-b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧ -p_432) -> (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0)
c  in CNF:
c     b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_2
c     b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_1
c     b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨  b^{54, 9}_0
c  in DIMACS:
 17153 -17154  17155  432 -17156 0
 17153 -17154  17155  432 -17157 0
 17153 -17154  17155  432  17158 0

c  1-1 --> 0
c    (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0 ∧ -p_432) -> (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧ -b^{54, 9}_0)
c  in CNF:
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_2
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_1
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_0
c  in DIMACS:
 17153  17154 -17155  432 -17156 0
 17153  17154 -17155  432 -17157 0
 17153  17154 -17155  432 -17158 0

c  0-1 --> -1
c    (-b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧ -p_432) -> ( b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0)
c  in CNF:
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨  b^{54, 9}_2
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_1
c     b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨  b^{54, 9}_0
c  in DIMACS:
 17153  17154  17155  432  17156 0
 17153  17154  17155  432 -17157 0
 17153  17154  17155  432  17158 0

c  -1-1 --> -2
c    ( b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧  b^{54, 8}_0 ∧ -p_432) -> ( b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0)
c  in CNF:
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨  b^{54, 9}_2
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨  b^{54, 9}_1
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨  p_432 ∨ -b^{54, 9}_0
c  in DIMACS:
-17153  17154 -17155  432  17156 0
-17153  17154 -17155  432  17157 0
-17153  17154 -17155  432 -17158 0

c  -2-1 --> break 
c    ( b^{54, 8}_2 ∧  b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨  b^{54, 8}_0 ∨  p_432 ∨ break
c  in DIMACS:
-17153 -17154  17155  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 8}_2 ∧ -b^{54, 8}_1 ∧ -b^{54, 8}_0 ∧ true) 
c  in CNF:
c    -b^{54, 8}_2 ∨  b^{54, 8}_1 ∨  b^{54, 8}_0 ∨ false 
c  in DIMACS:
-17153  17154  17155  0

c  3 does not represent an automaton state.
c    -(-b^{54, 8}_2 ∧  b^{54, 8}_1 ∧  b^{54, 8}_0 ∧ true) 
c  in CNF:
c     b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ false 
c  in DIMACS:
 17153 -17154 -17155  0
c  -3 does not represent an automaton state.
c    -( b^{54, 8}_2 ∧  b^{54, 8}_1 ∧  b^{54, 8}_0 ∧ true) 
c  in CNF:
c    -b^{54, 8}_2 ∨ -b^{54, 8}_1 ∨ -b^{54, 8}_0 ∨ false 
c  in DIMACS:
-17153 -17154 -17155  0

c i = 9
c  -2+1 --> -1
c    ( b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧  p_486) -> ( b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0)
c  in CNF:
c    -b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨  b^{54, 10}_2
c    -b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_1
c    -b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨  b^{54, 10}_0
c  in DIMACS:
-17156 -17157  17158 -486  17159 0
-17156 -17157  17158 -486 -17160 0
-17156 -17157  17158 -486  17161 0

c  -1+1 --> 0
c    ( b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0 ∧  p_486) -> (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧ -b^{54, 10}_0)
c  in CNF:
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_2
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_1
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_0
c  in DIMACS:
-17156  17157 -17158 -486 -17159 0
-17156  17157 -17158 -486 -17160 0
-17156  17157 -17158 -486 -17161 0

c  0+1 --> 1
c    (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧  p_486) -> (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0)
c  in CNF:
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_2
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_1
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨  b^{54, 10}_0
c  in DIMACS:
 17156  17157  17158 -486 -17159 0
 17156  17157  17158 -486 -17160 0
 17156  17157  17158 -486  17161 0

c  1+1 --> 2
c    (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0 ∧  p_486) -> (-b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0)
c  in CNF:
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_2
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨  b^{54, 10}_1
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ -p_486 ∨ -b^{54, 10}_0
c  in DIMACS:
 17156  17157 -17158 -486 -17159 0
 17156  17157 -17158 -486  17160 0
 17156  17157 -17158 -486 -17161 0

c  2+1 --> break 
c    (-b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧  p_486) -> break
c  in CNF:
c     b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 17156 -17157  17158 -486 1162 0


c  2-1 --> 1
c    (-b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧ -p_486) -> (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0)
c  in CNF:
c     b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_2
c     b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_1
c     b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨  b^{54, 10}_0
c  in DIMACS:
 17156 -17157  17158  486 -17159 0
 17156 -17157  17158  486 -17160 0
 17156 -17157  17158  486  17161 0

c  1-1 --> 0
c    (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0 ∧ -p_486) -> (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧ -b^{54, 10}_0)
c  in CNF:
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_2
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_1
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_0
c  in DIMACS:
 17156  17157 -17158  486 -17159 0
 17156  17157 -17158  486 -17160 0
 17156  17157 -17158  486 -17161 0

c  0-1 --> -1
c    (-b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧ -p_486) -> ( b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0)
c  in CNF:
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨  b^{54, 10}_2
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_1
c     b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨  b^{54, 10}_0
c  in DIMACS:
 17156  17157  17158  486  17159 0
 17156  17157  17158  486 -17160 0
 17156  17157  17158  486  17161 0

c  -1-1 --> -2
c    ( b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧  b^{54, 9}_0 ∧ -p_486) -> ( b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0)
c  in CNF:
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨  b^{54, 10}_2
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨  b^{54, 10}_1
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨  p_486 ∨ -b^{54, 10}_0
c  in DIMACS:
-17156  17157 -17158  486  17159 0
-17156  17157 -17158  486  17160 0
-17156  17157 -17158  486 -17161 0

c  -2-1 --> break 
c    ( b^{54, 9}_2 ∧  b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨  b^{54, 9}_0 ∨  p_486 ∨ break
c  in DIMACS:
-17156 -17157  17158  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 9}_2 ∧ -b^{54, 9}_1 ∧ -b^{54, 9}_0 ∧ true) 
c  in CNF:
c    -b^{54, 9}_2 ∨  b^{54, 9}_1 ∨  b^{54, 9}_0 ∨ false 
c  in DIMACS:
-17156  17157  17158  0

c  3 does not represent an automaton state.
c    -(-b^{54, 9}_2 ∧  b^{54, 9}_1 ∧  b^{54, 9}_0 ∧ true) 
c  in CNF:
c     b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ false 
c  in DIMACS:
 17156 -17157 -17158  0
c  -3 does not represent an automaton state.
c    -( b^{54, 9}_2 ∧  b^{54, 9}_1 ∧  b^{54, 9}_0 ∧ true) 
c  in CNF:
c    -b^{54, 9}_2 ∨ -b^{54, 9}_1 ∨ -b^{54, 9}_0 ∨ false 
c  in DIMACS:
-17156 -17157 -17158  0

c i = 10
c  -2+1 --> -1
c    ( b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧  p_540) -> ( b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0)
c  in CNF:
c    -b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨  b^{54, 11}_2
c    -b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_1
c    -b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨  b^{54, 11}_0
c  in DIMACS:
-17159 -17160  17161 -540  17162 0
-17159 -17160  17161 -540 -17163 0
-17159 -17160  17161 -540  17164 0

c  -1+1 --> 0
c    ( b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0 ∧  p_540) -> (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧ -b^{54, 11}_0)
c  in CNF:
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_2
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_1
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_0
c  in DIMACS:
-17159  17160 -17161 -540 -17162 0
-17159  17160 -17161 -540 -17163 0
-17159  17160 -17161 -540 -17164 0

c  0+1 --> 1
c    (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧  p_540) -> (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0)
c  in CNF:
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_2
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_1
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨  b^{54, 11}_0
c  in DIMACS:
 17159  17160  17161 -540 -17162 0
 17159  17160  17161 -540 -17163 0
 17159  17160  17161 -540  17164 0

c  1+1 --> 2
c    (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0 ∧  p_540) -> (-b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0)
c  in CNF:
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_2
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨  b^{54, 11}_1
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ -p_540 ∨ -b^{54, 11}_0
c  in DIMACS:
 17159  17160 -17161 -540 -17162 0
 17159  17160 -17161 -540  17163 0
 17159  17160 -17161 -540 -17164 0

c  2+1 --> break 
c    (-b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧  p_540) -> break
c  in CNF:
c     b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 17159 -17160  17161 -540 1162 0


c  2-1 --> 1
c    (-b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧ -p_540) -> (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0)
c  in CNF:
c     b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_2
c     b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_1
c     b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨  b^{54, 11}_0
c  in DIMACS:
 17159 -17160  17161  540 -17162 0
 17159 -17160  17161  540 -17163 0
 17159 -17160  17161  540  17164 0

c  1-1 --> 0
c    (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0 ∧ -p_540) -> (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧ -b^{54, 11}_0)
c  in CNF:
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_2
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_1
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_0
c  in DIMACS:
 17159  17160 -17161  540 -17162 0
 17159  17160 -17161  540 -17163 0
 17159  17160 -17161  540 -17164 0

c  0-1 --> -1
c    (-b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧ -p_540) -> ( b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0)
c  in CNF:
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨  b^{54, 11}_2
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_1
c     b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨  b^{54, 11}_0
c  in DIMACS:
 17159  17160  17161  540  17162 0
 17159  17160  17161  540 -17163 0
 17159  17160  17161  540  17164 0

c  -1-1 --> -2
c    ( b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧  b^{54, 10}_0 ∧ -p_540) -> ( b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0)
c  in CNF:
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨  b^{54, 11}_2
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨  b^{54, 11}_1
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨  p_540 ∨ -b^{54, 11}_0
c  in DIMACS:
-17159  17160 -17161  540  17162 0
-17159  17160 -17161  540  17163 0
-17159  17160 -17161  540 -17164 0

c  -2-1 --> break 
c    ( b^{54, 10}_2 ∧  b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨  b^{54, 10}_0 ∨  p_540 ∨ break
c  in DIMACS:
-17159 -17160  17161  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 10}_2 ∧ -b^{54, 10}_1 ∧ -b^{54, 10}_0 ∧ true) 
c  in CNF:
c    -b^{54, 10}_2 ∨  b^{54, 10}_1 ∨  b^{54, 10}_0 ∨ false 
c  in DIMACS:
-17159  17160  17161  0

c  3 does not represent an automaton state.
c    -(-b^{54, 10}_2 ∧  b^{54, 10}_1 ∧  b^{54, 10}_0 ∧ true) 
c  in CNF:
c     b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ false 
c  in DIMACS:
 17159 -17160 -17161  0
c  -3 does not represent an automaton state.
c    -( b^{54, 10}_2 ∧  b^{54, 10}_1 ∧  b^{54, 10}_0 ∧ true) 
c  in CNF:
c    -b^{54, 10}_2 ∨ -b^{54, 10}_1 ∨ -b^{54, 10}_0 ∨ false 
c  in DIMACS:
-17159 -17160 -17161  0

c i = 11
c  -2+1 --> -1
c    ( b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧  p_594) -> ( b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0)
c  in CNF:
c    -b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨  b^{54, 12}_2
c    -b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_1
c    -b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨  b^{54, 12}_0
c  in DIMACS:
-17162 -17163  17164 -594  17165 0
-17162 -17163  17164 -594 -17166 0
-17162 -17163  17164 -594  17167 0

c  -1+1 --> 0
c    ( b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0 ∧  p_594) -> (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧ -b^{54, 12}_0)
c  in CNF:
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_2
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_1
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_0
c  in DIMACS:
-17162  17163 -17164 -594 -17165 0
-17162  17163 -17164 -594 -17166 0
-17162  17163 -17164 -594 -17167 0

c  0+1 --> 1
c    (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧  p_594) -> (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0)
c  in CNF:
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_2
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_1
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨  b^{54, 12}_0
c  in DIMACS:
 17162  17163  17164 -594 -17165 0
 17162  17163  17164 -594 -17166 0
 17162  17163  17164 -594  17167 0

c  1+1 --> 2
c    (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0 ∧  p_594) -> (-b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0)
c  in CNF:
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_2
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨  b^{54, 12}_1
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ -p_594 ∨ -b^{54, 12}_0
c  in DIMACS:
 17162  17163 -17164 -594 -17165 0
 17162  17163 -17164 -594  17166 0
 17162  17163 -17164 -594 -17167 0

c  2+1 --> break 
c    (-b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧  p_594) -> break
c  in CNF:
c     b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 17162 -17163  17164 -594 1162 0


c  2-1 --> 1
c    (-b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧ -p_594) -> (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0)
c  in CNF:
c     b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_2
c     b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_1
c     b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨  b^{54, 12}_0
c  in DIMACS:
 17162 -17163  17164  594 -17165 0
 17162 -17163  17164  594 -17166 0
 17162 -17163  17164  594  17167 0

c  1-1 --> 0
c    (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0 ∧ -p_594) -> (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧ -b^{54, 12}_0)
c  in CNF:
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_2
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_1
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_0
c  in DIMACS:
 17162  17163 -17164  594 -17165 0
 17162  17163 -17164  594 -17166 0
 17162  17163 -17164  594 -17167 0

c  0-1 --> -1
c    (-b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧ -p_594) -> ( b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0)
c  in CNF:
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨  b^{54, 12}_2
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_1
c     b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨  b^{54, 12}_0
c  in DIMACS:
 17162  17163  17164  594  17165 0
 17162  17163  17164  594 -17166 0
 17162  17163  17164  594  17167 0

c  -1-1 --> -2
c    ( b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧  b^{54, 11}_0 ∧ -p_594) -> ( b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0)
c  in CNF:
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨  b^{54, 12}_2
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨  b^{54, 12}_1
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨  p_594 ∨ -b^{54, 12}_0
c  in DIMACS:
-17162  17163 -17164  594  17165 0
-17162  17163 -17164  594  17166 0
-17162  17163 -17164  594 -17167 0

c  -2-1 --> break 
c    ( b^{54, 11}_2 ∧  b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨  b^{54, 11}_0 ∨  p_594 ∨ break
c  in DIMACS:
-17162 -17163  17164  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 11}_2 ∧ -b^{54, 11}_1 ∧ -b^{54, 11}_0 ∧ true) 
c  in CNF:
c    -b^{54, 11}_2 ∨  b^{54, 11}_1 ∨  b^{54, 11}_0 ∨ false 
c  in DIMACS:
-17162  17163  17164  0

c  3 does not represent an automaton state.
c    -(-b^{54, 11}_2 ∧  b^{54, 11}_1 ∧  b^{54, 11}_0 ∧ true) 
c  in CNF:
c     b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ false 
c  in DIMACS:
 17162 -17163 -17164  0
c  -3 does not represent an automaton state.
c    -( b^{54, 11}_2 ∧  b^{54, 11}_1 ∧  b^{54, 11}_0 ∧ true) 
c  in CNF:
c    -b^{54, 11}_2 ∨ -b^{54, 11}_1 ∨ -b^{54, 11}_0 ∨ false 
c  in DIMACS:
-17162 -17163 -17164  0

c i = 12
c  -2+1 --> -1
c    ( b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧  p_648) -> ( b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0)
c  in CNF:
c    -b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨  b^{54, 13}_2
c    -b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_1
c    -b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨  b^{54, 13}_0
c  in DIMACS:
-17165 -17166  17167 -648  17168 0
-17165 -17166  17167 -648 -17169 0
-17165 -17166  17167 -648  17170 0

c  -1+1 --> 0
c    ( b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0 ∧  p_648) -> (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧ -b^{54, 13}_0)
c  in CNF:
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_2
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_1
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_0
c  in DIMACS:
-17165  17166 -17167 -648 -17168 0
-17165  17166 -17167 -648 -17169 0
-17165  17166 -17167 -648 -17170 0

c  0+1 --> 1
c    (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧  p_648) -> (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0)
c  in CNF:
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_2
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_1
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨  b^{54, 13}_0
c  in DIMACS:
 17165  17166  17167 -648 -17168 0
 17165  17166  17167 -648 -17169 0
 17165  17166  17167 -648  17170 0

c  1+1 --> 2
c    (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0 ∧  p_648) -> (-b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0)
c  in CNF:
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_2
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨  b^{54, 13}_1
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ -p_648 ∨ -b^{54, 13}_0
c  in DIMACS:
 17165  17166 -17167 -648 -17168 0
 17165  17166 -17167 -648  17169 0
 17165  17166 -17167 -648 -17170 0

c  2+1 --> break 
c    (-b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧  p_648) -> break
c  in CNF:
c     b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 17165 -17166  17167 -648 1162 0


c  2-1 --> 1
c    (-b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧ -p_648) -> (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0)
c  in CNF:
c     b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_2
c     b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_1
c     b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨  b^{54, 13}_0
c  in DIMACS:
 17165 -17166  17167  648 -17168 0
 17165 -17166  17167  648 -17169 0
 17165 -17166  17167  648  17170 0

c  1-1 --> 0
c    (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0 ∧ -p_648) -> (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧ -b^{54, 13}_0)
c  in CNF:
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_2
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_1
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_0
c  in DIMACS:
 17165  17166 -17167  648 -17168 0
 17165  17166 -17167  648 -17169 0
 17165  17166 -17167  648 -17170 0

c  0-1 --> -1
c    (-b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧ -p_648) -> ( b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0)
c  in CNF:
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨  b^{54, 13}_2
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_1
c     b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨  b^{54, 13}_0
c  in DIMACS:
 17165  17166  17167  648  17168 0
 17165  17166  17167  648 -17169 0
 17165  17166  17167  648  17170 0

c  -1-1 --> -2
c    ( b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧  b^{54, 12}_0 ∧ -p_648) -> ( b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0)
c  in CNF:
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨  b^{54, 13}_2
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨  b^{54, 13}_1
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨  p_648 ∨ -b^{54, 13}_0
c  in DIMACS:
-17165  17166 -17167  648  17168 0
-17165  17166 -17167  648  17169 0
-17165  17166 -17167  648 -17170 0

c  -2-1 --> break 
c    ( b^{54, 12}_2 ∧  b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨  b^{54, 12}_0 ∨  p_648 ∨ break
c  in DIMACS:
-17165 -17166  17167  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 12}_2 ∧ -b^{54, 12}_1 ∧ -b^{54, 12}_0 ∧ true) 
c  in CNF:
c    -b^{54, 12}_2 ∨  b^{54, 12}_1 ∨  b^{54, 12}_0 ∨ false 
c  in DIMACS:
-17165  17166  17167  0

c  3 does not represent an automaton state.
c    -(-b^{54, 12}_2 ∧  b^{54, 12}_1 ∧  b^{54, 12}_0 ∧ true) 
c  in CNF:
c     b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ false 
c  in DIMACS:
 17165 -17166 -17167  0
c  -3 does not represent an automaton state.
c    -( b^{54, 12}_2 ∧  b^{54, 12}_1 ∧  b^{54, 12}_0 ∧ true) 
c  in CNF:
c    -b^{54, 12}_2 ∨ -b^{54, 12}_1 ∨ -b^{54, 12}_0 ∨ false 
c  in DIMACS:
-17165 -17166 -17167  0

c i = 13
c  -2+1 --> -1
c    ( b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧  p_702) -> ( b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0)
c  in CNF:
c    -b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨  b^{54, 14}_2
c    -b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_1
c    -b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨  b^{54, 14}_0
c  in DIMACS:
-17168 -17169  17170 -702  17171 0
-17168 -17169  17170 -702 -17172 0
-17168 -17169  17170 -702  17173 0

c  -1+1 --> 0
c    ( b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0 ∧  p_702) -> (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧ -b^{54, 14}_0)
c  in CNF:
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_2
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_1
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_0
c  in DIMACS:
-17168  17169 -17170 -702 -17171 0
-17168  17169 -17170 -702 -17172 0
-17168  17169 -17170 -702 -17173 0

c  0+1 --> 1
c    (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧  p_702) -> (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0)
c  in CNF:
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_2
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_1
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨  b^{54, 14}_0
c  in DIMACS:
 17168  17169  17170 -702 -17171 0
 17168  17169  17170 -702 -17172 0
 17168  17169  17170 -702  17173 0

c  1+1 --> 2
c    (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0 ∧  p_702) -> (-b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0)
c  in CNF:
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_2
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨  b^{54, 14}_1
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ -p_702 ∨ -b^{54, 14}_0
c  in DIMACS:
 17168  17169 -17170 -702 -17171 0
 17168  17169 -17170 -702  17172 0
 17168  17169 -17170 -702 -17173 0

c  2+1 --> break 
c    (-b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧  p_702) -> break
c  in CNF:
c     b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 17168 -17169  17170 -702 1162 0


c  2-1 --> 1
c    (-b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧ -p_702) -> (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0)
c  in CNF:
c     b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_2
c     b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_1
c     b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨  b^{54, 14}_0
c  in DIMACS:
 17168 -17169  17170  702 -17171 0
 17168 -17169  17170  702 -17172 0
 17168 -17169  17170  702  17173 0

c  1-1 --> 0
c    (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0 ∧ -p_702) -> (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧ -b^{54, 14}_0)
c  in CNF:
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_2
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_1
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_0
c  in DIMACS:
 17168  17169 -17170  702 -17171 0
 17168  17169 -17170  702 -17172 0
 17168  17169 -17170  702 -17173 0

c  0-1 --> -1
c    (-b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧ -p_702) -> ( b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0)
c  in CNF:
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨  b^{54, 14}_2
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_1
c     b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨  b^{54, 14}_0
c  in DIMACS:
 17168  17169  17170  702  17171 0
 17168  17169  17170  702 -17172 0
 17168  17169  17170  702  17173 0

c  -1-1 --> -2
c    ( b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧  b^{54, 13}_0 ∧ -p_702) -> ( b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0)
c  in CNF:
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨  b^{54, 14}_2
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨  b^{54, 14}_1
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨  p_702 ∨ -b^{54, 14}_0
c  in DIMACS:
-17168  17169 -17170  702  17171 0
-17168  17169 -17170  702  17172 0
-17168  17169 -17170  702 -17173 0

c  -2-1 --> break 
c    ( b^{54, 13}_2 ∧  b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨  b^{54, 13}_0 ∨  p_702 ∨ break
c  in DIMACS:
-17168 -17169  17170  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 13}_2 ∧ -b^{54, 13}_1 ∧ -b^{54, 13}_0 ∧ true) 
c  in CNF:
c    -b^{54, 13}_2 ∨  b^{54, 13}_1 ∨  b^{54, 13}_0 ∨ false 
c  in DIMACS:
-17168  17169  17170  0

c  3 does not represent an automaton state.
c    -(-b^{54, 13}_2 ∧  b^{54, 13}_1 ∧  b^{54, 13}_0 ∧ true) 
c  in CNF:
c     b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ false 
c  in DIMACS:
 17168 -17169 -17170  0
c  -3 does not represent an automaton state.
c    -( b^{54, 13}_2 ∧  b^{54, 13}_1 ∧  b^{54, 13}_0 ∧ true) 
c  in CNF:
c    -b^{54, 13}_2 ∨ -b^{54, 13}_1 ∨ -b^{54, 13}_0 ∨ false 
c  in DIMACS:
-17168 -17169 -17170  0

c i = 14
c  -2+1 --> -1
c    ( b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧  p_756) -> ( b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0)
c  in CNF:
c    -b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨  b^{54, 15}_2
c    -b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_1
c    -b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨  b^{54, 15}_0
c  in DIMACS:
-17171 -17172  17173 -756  17174 0
-17171 -17172  17173 -756 -17175 0
-17171 -17172  17173 -756  17176 0

c  -1+1 --> 0
c    ( b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0 ∧  p_756) -> (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧ -b^{54, 15}_0)
c  in CNF:
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_2
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_1
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_0
c  in DIMACS:
-17171  17172 -17173 -756 -17174 0
-17171  17172 -17173 -756 -17175 0
-17171  17172 -17173 -756 -17176 0

c  0+1 --> 1
c    (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧  p_756) -> (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0)
c  in CNF:
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_2
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_1
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨  b^{54, 15}_0
c  in DIMACS:
 17171  17172  17173 -756 -17174 0
 17171  17172  17173 -756 -17175 0
 17171  17172  17173 -756  17176 0

c  1+1 --> 2
c    (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0 ∧  p_756) -> (-b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0)
c  in CNF:
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_2
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨  b^{54, 15}_1
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ -p_756 ∨ -b^{54, 15}_0
c  in DIMACS:
 17171  17172 -17173 -756 -17174 0
 17171  17172 -17173 -756  17175 0
 17171  17172 -17173 -756 -17176 0

c  2+1 --> break 
c    (-b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧  p_756) -> break
c  in CNF:
c     b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 17171 -17172  17173 -756 1162 0


c  2-1 --> 1
c    (-b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧ -p_756) -> (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0)
c  in CNF:
c     b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_2
c     b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_1
c     b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨  b^{54, 15}_0
c  in DIMACS:
 17171 -17172  17173  756 -17174 0
 17171 -17172  17173  756 -17175 0
 17171 -17172  17173  756  17176 0

c  1-1 --> 0
c    (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0 ∧ -p_756) -> (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧ -b^{54, 15}_0)
c  in CNF:
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_2
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_1
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_0
c  in DIMACS:
 17171  17172 -17173  756 -17174 0
 17171  17172 -17173  756 -17175 0
 17171  17172 -17173  756 -17176 0

c  0-1 --> -1
c    (-b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧ -p_756) -> ( b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0)
c  in CNF:
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨  b^{54, 15}_2
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_1
c     b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨  b^{54, 15}_0
c  in DIMACS:
 17171  17172  17173  756  17174 0
 17171  17172  17173  756 -17175 0
 17171  17172  17173  756  17176 0

c  -1-1 --> -2
c    ( b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧  b^{54, 14}_0 ∧ -p_756) -> ( b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0)
c  in CNF:
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨  b^{54, 15}_2
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨  b^{54, 15}_1
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨  p_756 ∨ -b^{54, 15}_0
c  in DIMACS:
-17171  17172 -17173  756  17174 0
-17171  17172 -17173  756  17175 0
-17171  17172 -17173  756 -17176 0

c  -2-1 --> break 
c    ( b^{54, 14}_2 ∧  b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨  b^{54, 14}_0 ∨  p_756 ∨ break
c  in DIMACS:
-17171 -17172  17173  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 14}_2 ∧ -b^{54, 14}_1 ∧ -b^{54, 14}_0 ∧ true) 
c  in CNF:
c    -b^{54, 14}_2 ∨  b^{54, 14}_1 ∨  b^{54, 14}_0 ∨ false 
c  in DIMACS:
-17171  17172  17173  0

c  3 does not represent an automaton state.
c    -(-b^{54, 14}_2 ∧  b^{54, 14}_1 ∧  b^{54, 14}_0 ∧ true) 
c  in CNF:
c     b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ false 
c  in DIMACS:
 17171 -17172 -17173  0
c  -3 does not represent an automaton state.
c    -( b^{54, 14}_2 ∧  b^{54, 14}_1 ∧  b^{54, 14}_0 ∧ true) 
c  in CNF:
c    -b^{54, 14}_2 ∨ -b^{54, 14}_1 ∨ -b^{54, 14}_0 ∨ false 
c  in DIMACS:
-17171 -17172 -17173  0

c i = 15
c  -2+1 --> -1
c    ( b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧  p_810) -> ( b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0)
c  in CNF:
c    -b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨  b^{54, 16}_2
c    -b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_1
c    -b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨  b^{54, 16}_0
c  in DIMACS:
-17174 -17175  17176 -810  17177 0
-17174 -17175  17176 -810 -17178 0
-17174 -17175  17176 -810  17179 0

c  -1+1 --> 0
c    ( b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0 ∧  p_810) -> (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧ -b^{54, 16}_0)
c  in CNF:
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_2
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_1
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_0
c  in DIMACS:
-17174  17175 -17176 -810 -17177 0
-17174  17175 -17176 -810 -17178 0
-17174  17175 -17176 -810 -17179 0

c  0+1 --> 1
c    (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧  p_810) -> (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0)
c  in CNF:
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_2
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_1
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨  b^{54, 16}_0
c  in DIMACS:
 17174  17175  17176 -810 -17177 0
 17174  17175  17176 -810 -17178 0
 17174  17175  17176 -810  17179 0

c  1+1 --> 2
c    (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0 ∧  p_810) -> (-b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0)
c  in CNF:
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_2
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨  b^{54, 16}_1
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ -p_810 ∨ -b^{54, 16}_0
c  in DIMACS:
 17174  17175 -17176 -810 -17177 0
 17174  17175 -17176 -810  17178 0
 17174  17175 -17176 -810 -17179 0

c  2+1 --> break 
c    (-b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧  p_810) -> break
c  in CNF:
c     b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 17174 -17175  17176 -810 1162 0


c  2-1 --> 1
c    (-b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧ -p_810) -> (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0)
c  in CNF:
c     b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_2
c     b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_1
c     b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨  b^{54, 16}_0
c  in DIMACS:
 17174 -17175  17176  810 -17177 0
 17174 -17175  17176  810 -17178 0
 17174 -17175  17176  810  17179 0

c  1-1 --> 0
c    (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0 ∧ -p_810) -> (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧ -b^{54, 16}_0)
c  in CNF:
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_2
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_1
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_0
c  in DIMACS:
 17174  17175 -17176  810 -17177 0
 17174  17175 -17176  810 -17178 0
 17174  17175 -17176  810 -17179 0

c  0-1 --> -1
c    (-b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧ -p_810) -> ( b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0)
c  in CNF:
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨  b^{54, 16}_2
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_1
c     b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨  b^{54, 16}_0
c  in DIMACS:
 17174  17175  17176  810  17177 0
 17174  17175  17176  810 -17178 0
 17174  17175  17176  810  17179 0

c  -1-1 --> -2
c    ( b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧  b^{54, 15}_0 ∧ -p_810) -> ( b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0)
c  in CNF:
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨  b^{54, 16}_2
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨  b^{54, 16}_1
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨  p_810 ∨ -b^{54, 16}_0
c  in DIMACS:
-17174  17175 -17176  810  17177 0
-17174  17175 -17176  810  17178 0
-17174  17175 -17176  810 -17179 0

c  -2-1 --> break 
c    ( b^{54, 15}_2 ∧  b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨  b^{54, 15}_0 ∨  p_810 ∨ break
c  in DIMACS:
-17174 -17175  17176  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 15}_2 ∧ -b^{54, 15}_1 ∧ -b^{54, 15}_0 ∧ true) 
c  in CNF:
c    -b^{54, 15}_2 ∨  b^{54, 15}_1 ∨  b^{54, 15}_0 ∨ false 
c  in DIMACS:
-17174  17175  17176  0

c  3 does not represent an automaton state.
c    -(-b^{54, 15}_2 ∧  b^{54, 15}_1 ∧  b^{54, 15}_0 ∧ true) 
c  in CNF:
c     b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ false 
c  in DIMACS:
 17174 -17175 -17176  0
c  -3 does not represent an automaton state.
c    -( b^{54, 15}_2 ∧  b^{54, 15}_1 ∧  b^{54, 15}_0 ∧ true) 
c  in CNF:
c    -b^{54, 15}_2 ∨ -b^{54, 15}_1 ∨ -b^{54, 15}_0 ∨ false 
c  in DIMACS:
-17174 -17175 -17176  0

c i = 16
c  -2+1 --> -1
c    ( b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧  p_864) -> ( b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0)
c  in CNF:
c    -b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨  b^{54, 17}_2
c    -b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_1
c    -b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨  b^{54, 17}_0
c  in DIMACS:
-17177 -17178  17179 -864  17180 0
-17177 -17178  17179 -864 -17181 0
-17177 -17178  17179 -864  17182 0

c  -1+1 --> 0
c    ( b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0 ∧  p_864) -> (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧ -b^{54, 17}_0)
c  in CNF:
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_2
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_1
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_0
c  in DIMACS:
-17177  17178 -17179 -864 -17180 0
-17177  17178 -17179 -864 -17181 0
-17177  17178 -17179 -864 -17182 0

c  0+1 --> 1
c    (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧  p_864) -> (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0)
c  in CNF:
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_2
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_1
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨  b^{54, 17}_0
c  in DIMACS:
 17177  17178  17179 -864 -17180 0
 17177  17178  17179 -864 -17181 0
 17177  17178  17179 -864  17182 0

c  1+1 --> 2
c    (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0 ∧  p_864) -> (-b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0)
c  in CNF:
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_2
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨  b^{54, 17}_1
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ -p_864 ∨ -b^{54, 17}_0
c  in DIMACS:
 17177  17178 -17179 -864 -17180 0
 17177  17178 -17179 -864  17181 0
 17177  17178 -17179 -864 -17182 0

c  2+1 --> break 
c    (-b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧  p_864) -> break
c  in CNF:
c     b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 17177 -17178  17179 -864 1162 0


c  2-1 --> 1
c    (-b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧ -p_864) -> (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0)
c  in CNF:
c     b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_2
c     b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_1
c     b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨  b^{54, 17}_0
c  in DIMACS:
 17177 -17178  17179  864 -17180 0
 17177 -17178  17179  864 -17181 0
 17177 -17178  17179  864  17182 0

c  1-1 --> 0
c    (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0 ∧ -p_864) -> (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧ -b^{54, 17}_0)
c  in CNF:
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_2
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_1
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_0
c  in DIMACS:
 17177  17178 -17179  864 -17180 0
 17177  17178 -17179  864 -17181 0
 17177  17178 -17179  864 -17182 0

c  0-1 --> -1
c    (-b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧ -p_864) -> ( b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0)
c  in CNF:
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨  b^{54, 17}_2
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_1
c     b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨  b^{54, 17}_0
c  in DIMACS:
 17177  17178  17179  864  17180 0
 17177  17178  17179  864 -17181 0
 17177  17178  17179  864  17182 0

c  -1-1 --> -2
c    ( b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧  b^{54, 16}_0 ∧ -p_864) -> ( b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0)
c  in CNF:
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨  b^{54, 17}_2
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨  b^{54, 17}_1
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨  p_864 ∨ -b^{54, 17}_0
c  in DIMACS:
-17177  17178 -17179  864  17180 0
-17177  17178 -17179  864  17181 0
-17177  17178 -17179  864 -17182 0

c  -2-1 --> break 
c    ( b^{54, 16}_2 ∧  b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨  b^{54, 16}_0 ∨  p_864 ∨ break
c  in DIMACS:
-17177 -17178  17179  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 16}_2 ∧ -b^{54, 16}_1 ∧ -b^{54, 16}_0 ∧ true) 
c  in CNF:
c    -b^{54, 16}_2 ∨  b^{54, 16}_1 ∨  b^{54, 16}_0 ∨ false 
c  in DIMACS:
-17177  17178  17179  0

c  3 does not represent an automaton state.
c    -(-b^{54, 16}_2 ∧  b^{54, 16}_1 ∧  b^{54, 16}_0 ∧ true) 
c  in CNF:
c     b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ false 
c  in DIMACS:
 17177 -17178 -17179  0
c  -3 does not represent an automaton state.
c    -( b^{54, 16}_2 ∧  b^{54, 16}_1 ∧  b^{54, 16}_0 ∧ true) 
c  in CNF:
c    -b^{54, 16}_2 ∨ -b^{54, 16}_1 ∨ -b^{54, 16}_0 ∨ false 
c  in DIMACS:
-17177 -17178 -17179  0

c i = 17
c  -2+1 --> -1
c    ( b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧  p_918) -> ( b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0)
c  in CNF:
c    -b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨  b^{54, 18}_2
c    -b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_1
c    -b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨  b^{54, 18}_0
c  in DIMACS:
-17180 -17181  17182 -918  17183 0
-17180 -17181  17182 -918 -17184 0
-17180 -17181  17182 -918  17185 0

c  -1+1 --> 0
c    ( b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0 ∧  p_918) -> (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧ -b^{54, 18}_0)
c  in CNF:
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_2
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_1
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_0
c  in DIMACS:
-17180  17181 -17182 -918 -17183 0
-17180  17181 -17182 -918 -17184 0
-17180  17181 -17182 -918 -17185 0

c  0+1 --> 1
c    (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧  p_918) -> (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0)
c  in CNF:
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_2
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_1
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨  b^{54, 18}_0
c  in DIMACS:
 17180  17181  17182 -918 -17183 0
 17180  17181  17182 -918 -17184 0
 17180  17181  17182 -918  17185 0

c  1+1 --> 2
c    (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0 ∧  p_918) -> (-b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0)
c  in CNF:
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_2
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨  b^{54, 18}_1
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ -p_918 ∨ -b^{54, 18}_0
c  in DIMACS:
 17180  17181 -17182 -918 -17183 0
 17180  17181 -17182 -918  17184 0
 17180  17181 -17182 -918 -17185 0

c  2+1 --> break 
c    (-b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧  p_918) -> break
c  in CNF:
c     b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 17180 -17181  17182 -918 1162 0


c  2-1 --> 1
c    (-b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧ -p_918) -> (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0)
c  in CNF:
c     b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_2
c     b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_1
c     b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨  b^{54, 18}_0
c  in DIMACS:
 17180 -17181  17182  918 -17183 0
 17180 -17181  17182  918 -17184 0
 17180 -17181  17182  918  17185 0

c  1-1 --> 0
c    (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0 ∧ -p_918) -> (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧ -b^{54, 18}_0)
c  in CNF:
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_2
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_1
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_0
c  in DIMACS:
 17180  17181 -17182  918 -17183 0
 17180  17181 -17182  918 -17184 0
 17180  17181 -17182  918 -17185 0

c  0-1 --> -1
c    (-b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧ -p_918) -> ( b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0)
c  in CNF:
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨  b^{54, 18}_2
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_1
c     b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨  b^{54, 18}_0
c  in DIMACS:
 17180  17181  17182  918  17183 0
 17180  17181  17182  918 -17184 0
 17180  17181  17182  918  17185 0

c  -1-1 --> -2
c    ( b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧  b^{54, 17}_0 ∧ -p_918) -> ( b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0)
c  in CNF:
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨  b^{54, 18}_2
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨  b^{54, 18}_1
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨  p_918 ∨ -b^{54, 18}_0
c  in DIMACS:
-17180  17181 -17182  918  17183 0
-17180  17181 -17182  918  17184 0
-17180  17181 -17182  918 -17185 0

c  -2-1 --> break 
c    ( b^{54, 17}_2 ∧  b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨  b^{54, 17}_0 ∨  p_918 ∨ break
c  in DIMACS:
-17180 -17181  17182  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 17}_2 ∧ -b^{54, 17}_1 ∧ -b^{54, 17}_0 ∧ true) 
c  in CNF:
c    -b^{54, 17}_2 ∨  b^{54, 17}_1 ∨  b^{54, 17}_0 ∨ false 
c  in DIMACS:
-17180  17181  17182  0

c  3 does not represent an automaton state.
c    -(-b^{54, 17}_2 ∧  b^{54, 17}_1 ∧  b^{54, 17}_0 ∧ true) 
c  in CNF:
c     b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ false 
c  in DIMACS:
 17180 -17181 -17182  0
c  -3 does not represent an automaton state.
c    -( b^{54, 17}_2 ∧  b^{54, 17}_1 ∧  b^{54, 17}_0 ∧ true) 
c  in CNF:
c    -b^{54, 17}_2 ∨ -b^{54, 17}_1 ∨ -b^{54, 17}_0 ∨ false 
c  in DIMACS:
-17180 -17181 -17182  0

c i = 18
c  -2+1 --> -1
c    ( b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧  p_972) -> ( b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0)
c  in CNF:
c    -b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨  b^{54, 19}_2
c    -b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_1
c    -b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨  b^{54, 19}_0
c  in DIMACS:
-17183 -17184  17185 -972  17186 0
-17183 -17184  17185 -972 -17187 0
-17183 -17184  17185 -972  17188 0

c  -1+1 --> 0
c    ( b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0 ∧  p_972) -> (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧ -b^{54, 19}_0)
c  in CNF:
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_2
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_1
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_0
c  in DIMACS:
-17183  17184 -17185 -972 -17186 0
-17183  17184 -17185 -972 -17187 0
-17183  17184 -17185 -972 -17188 0

c  0+1 --> 1
c    (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧  p_972) -> (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0)
c  in CNF:
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_2
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_1
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨  b^{54, 19}_0
c  in DIMACS:
 17183  17184  17185 -972 -17186 0
 17183  17184  17185 -972 -17187 0
 17183  17184  17185 -972  17188 0

c  1+1 --> 2
c    (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0 ∧  p_972) -> (-b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0)
c  in CNF:
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_2
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨  b^{54, 19}_1
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ -p_972 ∨ -b^{54, 19}_0
c  in DIMACS:
 17183  17184 -17185 -972 -17186 0
 17183  17184 -17185 -972  17187 0
 17183  17184 -17185 -972 -17188 0

c  2+1 --> break 
c    (-b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧  p_972) -> break
c  in CNF:
c     b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 17183 -17184  17185 -972 1162 0


c  2-1 --> 1
c    (-b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧ -p_972) -> (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0)
c  in CNF:
c     b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_2
c     b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_1
c     b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨  b^{54, 19}_0
c  in DIMACS:
 17183 -17184  17185  972 -17186 0
 17183 -17184  17185  972 -17187 0
 17183 -17184  17185  972  17188 0

c  1-1 --> 0
c    (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0 ∧ -p_972) -> (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧ -b^{54, 19}_0)
c  in CNF:
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_2
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_1
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_0
c  in DIMACS:
 17183  17184 -17185  972 -17186 0
 17183  17184 -17185  972 -17187 0
 17183  17184 -17185  972 -17188 0

c  0-1 --> -1
c    (-b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧ -p_972) -> ( b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0)
c  in CNF:
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨  b^{54, 19}_2
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_1
c     b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨  b^{54, 19}_0
c  in DIMACS:
 17183  17184  17185  972  17186 0
 17183  17184  17185  972 -17187 0
 17183  17184  17185  972  17188 0

c  -1-1 --> -2
c    ( b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧  b^{54, 18}_0 ∧ -p_972) -> ( b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0)
c  in CNF:
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨  b^{54, 19}_2
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨  b^{54, 19}_1
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨  p_972 ∨ -b^{54, 19}_0
c  in DIMACS:
-17183  17184 -17185  972  17186 0
-17183  17184 -17185  972  17187 0
-17183  17184 -17185  972 -17188 0

c  -2-1 --> break 
c    ( b^{54, 18}_2 ∧  b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨  b^{54, 18}_0 ∨  p_972 ∨ break
c  in DIMACS:
-17183 -17184  17185  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 18}_2 ∧ -b^{54, 18}_1 ∧ -b^{54, 18}_0 ∧ true) 
c  in CNF:
c    -b^{54, 18}_2 ∨  b^{54, 18}_1 ∨  b^{54, 18}_0 ∨ false 
c  in DIMACS:
-17183  17184  17185  0

c  3 does not represent an automaton state.
c    -(-b^{54, 18}_2 ∧  b^{54, 18}_1 ∧  b^{54, 18}_0 ∧ true) 
c  in CNF:
c     b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ false 
c  in DIMACS:
 17183 -17184 -17185  0
c  -3 does not represent an automaton state.
c    -( b^{54, 18}_2 ∧  b^{54, 18}_1 ∧  b^{54, 18}_0 ∧ true) 
c  in CNF:
c    -b^{54, 18}_2 ∨ -b^{54, 18}_1 ∨ -b^{54, 18}_0 ∨ false 
c  in DIMACS:
-17183 -17184 -17185  0

c i = 19
c  -2+1 --> -1
c    ( b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧  p_1026) -> ( b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0)
c  in CNF:
c    -b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨  b^{54, 20}_2
c    -b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_1
c    -b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨  b^{54, 20}_0
c  in DIMACS:
-17186 -17187  17188 -1026  17189 0
-17186 -17187  17188 -1026 -17190 0
-17186 -17187  17188 -1026  17191 0

c  -1+1 --> 0
c    ( b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0 ∧  p_1026) -> (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧ -b^{54, 20}_0)
c  in CNF:
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_2
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_1
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_0
c  in DIMACS:
-17186  17187 -17188 -1026 -17189 0
-17186  17187 -17188 -1026 -17190 0
-17186  17187 -17188 -1026 -17191 0

c  0+1 --> 1
c    (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧  p_1026) -> (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0)
c  in CNF:
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_2
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_1
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨  b^{54, 20}_0
c  in DIMACS:
 17186  17187  17188 -1026 -17189 0
 17186  17187  17188 -1026 -17190 0
 17186  17187  17188 -1026  17191 0

c  1+1 --> 2
c    (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0 ∧  p_1026) -> (-b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0)
c  in CNF:
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_2
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨  b^{54, 20}_1
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ -p_1026 ∨ -b^{54, 20}_0
c  in DIMACS:
 17186  17187 -17188 -1026 -17189 0
 17186  17187 -17188 -1026  17190 0
 17186  17187 -17188 -1026 -17191 0

c  2+1 --> break 
c    (-b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 17186 -17187  17188 -1026 1162 0


c  2-1 --> 1
c    (-b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧ -p_1026) -> (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0)
c  in CNF:
c     b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_2
c     b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_1
c     b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨  b^{54, 20}_0
c  in DIMACS:
 17186 -17187  17188  1026 -17189 0
 17186 -17187  17188  1026 -17190 0
 17186 -17187  17188  1026  17191 0

c  1-1 --> 0
c    (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0 ∧ -p_1026) -> (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧ -b^{54, 20}_0)
c  in CNF:
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_2
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_1
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_0
c  in DIMACS:
 17186  17187 -17188  1026 -17189 0
 17186  17187 -17188  1026 -17190 0
 17186  17187 -17188  1026 -17191 0

c  0-1 --> -1
c    (-b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧ -p_1026) -> ( b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0)
c  in CNF:
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨  b^{54, 20}_2
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_1
c     b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨  b^{54, 20}_0
c  in DIMACS:
 17186  17187  17188  1026  17189 0
 17186  17187  17188  1026 -17190 0
 17186  17187  17188  1026  17191 0

c  -1-1 --> -2
c    ( b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧  b^{54, 19}_0 ∧ -p_1026) -> ( b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0)
c  in CNF:
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨  b^{54, 20}_2
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨  b^{54, 20}_1
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨  p_1026 ∨ -b^{54, 20}_0
c  in DIMACS:
-17186  17187 -17188  1026  17189 0
-17186  17187 -17188  1026  17190 0
-17186  17187 -17188  1026 -17191 0

c  -2-1 --> break 
c    ( b^{54, 19}_2 ∧  b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨  b^{54, 19}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-17186 -17187  17188  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 19}_2 ∧ -b^{54, 19}_1 ∧ -b^{54, 19}_0 ∧ true) 
c  in CNF:
c    -b^{54, 19}_2 ∨  b^{54, 19}_1 ∨  b^{54, 19}_0 ∨ false 
c  in DIMACS:
-17186  17187  17188  0

c  3 does not represent an automaton state.
c    -(-b^{54, 19}_2 ∧  b^{54, 19}_1 ∧  b^{54, 19}_0 ∧ true) 
c  in CNF:
c     b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ false 
c  in DIMACS:
 17186 -17187 -17188  0
c  -3 does not represent an automaton state.
c    -( b^{54, 19}_2 ∧  b^{54, 19}_1 ∧  b^{54, 19}_0 ∧ true) 
c  in CNF:
c    -b^{54, 19}_2 ∨ -b^{54, 19}_1 ∨ -b^{54, 19}_0 ∨ false 
c  in DIMACS:
-17186 -17187 -17188  0

c i = 20
c  -2+1 --> -1
c    ( b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧  p_1080) -> ( b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0)
c  in CNF:
c    -b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨  b^{54, 21}_2
c    -b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_1
c    -b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨  b^{54, 21}_0
c  in DIMACS:
-17189 -17190  17191 -1080  17192 0
-17189 -17190  17191 -1080 -17193 0
-17189 -17190  17191 -1080  17194 0

c  -1+1 --> 0
c    ( b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0 ∧  p_1080) -> (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧ -b^{54, 21}_0)
c  in CNF:
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_2
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_1
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_0
c  in DIMACS:
-17189  17190 -17191 -1080 -17192 0
-17189  17190 -17191 -1080 -17193 0
-17189  17190 -17191 -1080 -17194 0

c  0+1 --> 1
c    (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧  p_1080) -> (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0)
c  in CNF:
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_2
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_1
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨  b^{54, 21}_0
c  in DIMACS:
 17189  17190  17191 -1080 -17192 0
 17189  17190  17191 -1080 -17193 0
 17189  17190  17191 -1080  17194 0

c  1+1 --> 2
c    (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0 ∧  p_1080) -> (-b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0)
c  in CNF:
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_2
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨  b^{54, 21}_1
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ -p_1080 ∨ -b^{54, 21}_0
c  in DIMACS:
 17189  17190 -17191 -1080 -17192 0
 17189  17190 -17191 -1080  17193 0
 17189  17190 -17191 -1080 -17194 0

c  2+1 --> break 
c    (-b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 17189 -17190  17191 -1080 1162 0


c  2-1 --> 1
c    (-b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧ -p_1080) -> (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0)
c  in CNF:
c     b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_2
c     b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_1
c     b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨  b^{54, 21}_0
c  in DIMACS:
 17189 -17190  17191  1080 -17192 0
 17189 -17190  17191  1080 -17193 0
 17189 -17190  17191  1080  17194 0

c  1-1 --> 0
c    (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0 ∧ -p_1080) -> (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧ -b^{54, 21}_0)
c  in CNF:
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_2
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_1
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_0
c  in DIMACS:
 17189  17190 -17191  1080 -17192 0
 17189  17190 -17191  1080 -17193 0
 17189  17190 -17191  1080 -17194 0

c  0-1 --> -1
c    (-b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧ -p_1080) -> ( b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0)
c  in CNF:
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨  b^{54, 21}_2
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_1
c     b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨  b^{54, 21}_0
c  in DIMACS:
 17189  17190  17191  1080  17192 0
 17189  17190  17191  1080 -17193 0
 17189  17190  17191  1080  17194 0

c  -1-1 --> -2
c    ( b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧  b^{54, 20}_0 ∧ -p_1080) -> ( b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0)
c  in CNF:
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨  b^{54, 21}_2
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨  b^{54, 21}_1
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨  p_1080 ∨ -b^{54, 21}_0
c  in DIMACS:
-17189  17190 -17191  1080  17192 0
-17189  17190 -17191  1080  17193 0
-17189  17190 -17191  1080 -17194 0

c  -2-1 --> break 
c    ( b^{54, 20}_2 ∧  b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨  b^{54, 20}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-17189 -17190  17191  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 20}_2 ∧ -b^{54, 20}_1 ∧ -b^{54, 20}_0 ∧ true) 
c  in CNF:
c    -b^{54, 20}_2 ∨  b^{54, 20}_1 ∨  b^{54, 20}_0 ∨ false 
c  in DIMACS:
-17189  17190  17191  0

c  3 does not represent an automaton state.
c    -(-b^{54, 20}_2 ∧  b^{54, 20}_1 ∧  b^{54, 20}_0 ∧ true) 
c  in CNF:
c     b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ false 
c  in DIMACS:
 17189 -17190 -17191  0
c  -3 does not represent an automaton state.
c    -( b^{54, 20}_2 ∧  b^{54, 20}_1 ∧  b^{54, 20}_0 ∧ true) 
c  in CNF:
c    -b^{54, 20}_2 ∨ -b^{54, 20}_1 ∨ -b^{54, 20}_0 ∨ false 
c  in DIMACS:
-17189 -17190 -17191  0

c i = 21
c  -2+1 --> -1
c    ( b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧  p_1134) -> ( b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧  b^{54, 22}_0)
c  in CNF:
c    -b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨  b^{54, 22}_2
c    -b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_1
c    -b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨  b^{54, 22}_0
c  in DIMACS:
-17192 -17193  17194 -1134  17195 0
-17192 -17193  17194 -1134 -17196 0
-17192 -17193  17194 -1134  17197 0

c  -1+1 --> 0
c    ( b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0 ∧  p_1134) -> (-b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧ -b^{54, 22}_0)
c  in CNF:
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_2
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_1
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_0
c  in DIMACS:
-17192  17193 -17194 -1134 -17195 0
-17192  17193 -17194 -1134 -17196 0
-17192  17193 -17194 -1134 -17197 0

c  0+1 --> 1
c    (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧  p_1134) -> (-b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧  b^{54, 22}_0)
c  in CNF:
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_2
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_1
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨  b^{54, 22}_0
c  in DIMACS:
 17192  17193  17194 -1134 -17195 0
 17192  17193  17194 -1134 -17196 0
 17192  17193  17194 -1134  17197 0

c  1+1 --> 2
c    (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0 ∧  p_1134) -> (-b^{54, 22}_2 ∧  b^{54, 22}_1 ∧ -b^{54, 22}_0)
c  in CNF:
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_2
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨  b^{54, 22}_1
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ -p_1134 ∨ -b^{54, 22}_0
c  in DIMACS:
 17192  17193 -17194 -1134 -17195 0
 17192  17193 -17194 -1134  17196 0
 17192  17193 -17194 -1134 -17197 0

c  2+1 --> break 
c    (-b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 17192 -17193  17194 -1134 1162 0


c  2-1 --> 1
c    (-b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧ -p_1134) -> (-b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧  b^{54, 22}_0)
c  in CNF:
c     b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_2
c     b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_1
c     b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨  b^{54, 22}_0
c  in DIMACS:
 17192 -17193  17194  1134 -17195 0
 17192 -17193  17194  1134 -17196 0
 17192 -17193  17194  1134  17197 0

c  1-1 --> 0
c    (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0 ∧ -p_1134) -> (-b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧ -b^{54, 22}_0)
c  in CNF:
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_2
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_1
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_0
c  in DIMACS:
 17192  17193 -17194  1134 -17195 0
 17192  17193 -17194  1134 -17196 0
 17192  17193 -17194  1134 -17197 0

c  0-1 --> -1
c    (-b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧ -p_1134) -> ( b^{54, 22}_2 ∧ -b^{54, 22}_1 ∧  b^{54, 22}_0)
c  in CNF:
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨  b^{54, 22}_2
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_1
c     b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨  b^{54, 22}_0
c  in DIMACS:
 17192  17193  17194  1134  17195 0
 17192  17193  17194  1134 -17196 0
 17192  17193  17194  1134  17197 0

c  -1-1 --> -2
c    ( b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧  b^{54, 21}_0 ∧ -p_1134) -> ( b^{54, 22}_2 ∧  b^{54, 22}_1 ∧ -b^{54, 22}_0)
c  in CNF:
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨  b^{54, 22}_2
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨  b^{54, 22}_1
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨  p_1134 ∨ -b^{54, 22}_0
c  in DIMACS:
-17192  17193 -17194  1134  17195 0
-17192  17193 -17194  1134  17196 0
-17192  17193 -17194  1134 -17197 0

c  -2-1 --> break 
c    ( b^{54, 21}_2 ∧  b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨  b^{54, 21}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-17192 -17193  17194  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{54, 21}_2 ∧ -b^{54, 21}_1 ∧ -b^{54, 21}_0 ∧ true) 
c  in CNF:
c    -b^{54, 21}_2 ∨  b^{54, 21}_1 ∨  b^{54, 21}_0 ∨ false 
c  in DIMACS:
-17192  17193  17194  0

c  3 does not represent an automaton state.
c    -(-b^{54, 21}_2 ∧  b^{54, 21}_1 ∧  b^{54, 21}_0 ∧ true) 
c  in CNF:
c     b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ false 
c  in DIMACS:
 17192 -17193 -17194  0
c  -3 does not represent an automaton state.
c    -( b^{54, 21}_2 ∧  b^{54, 21}_1 ∧  b^{54, 21}_0 ∧ true) 
c  in CNF:
c    -b^{54, 21}_2 ∨ -b^{54, 21}_1 ∨ -b^{54, 21}_0 ∨ false 
c  in DIMACS:
-17192 -17193 -17194  0

c INIT for k = 55
c    -b^{55, 1}_2
c    -b^{55, 1}_1
c    -b^{55, 1}_0
c  in DIMACS:
-17198 0
-17199 0
-17200 0

c Transitions for k = 55
c i = 1
c  -2+1 --> -1
c    ( b^{55, 1}_2 ∧  b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧  p_55) -> ( b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0)
c  in CNF:
c    -b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨  b^{55, 2}_2
c    -b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_1
c    -b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨  b^{55, 2}_0
c  in DIMACS:
-17198 -17199  17200 -55  17201 0
-17198 -17199  17200 -55 -17202 0
-17198 -17199  17200 -55  17203 0

c  -1+1 --> 0
c    ( b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧  b^{55, 1}_0 ∧  p_55) -> (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧ -b^{55, 2}_0)
c  in CNF:
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_2
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_1
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_0
c  in DIMACS:
-17198  17199 -17200 -55 -17201 0
-17198  17199 -17200 -55 -17202 0
-17198  17199 -17200 -55 -17203 0

c  0+1 --> 1
c    (-b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧  p_55) -> (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0)
c  in CNF:
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_2
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_1
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨  b^{55, 2}_0
c  in DIMACS:
 17198  17199  17200 -55 -17201 0
 17198  17199  17200 -55 -17202 0
 17198  17199  17200 -55  17203 0

c  1+1 --> 2
c    (-b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧  b^{55, 1}_0 ∧  p_55) -> (-b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0)
c  in CNF:
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_2
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨  b^{55, 2}_1
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ -p_55 ∨ -b^{55, 2}_0
c  in DIMACS:
 17198  17199 -17200 -55 -17201 0
 17198  17199 -17200 -55  17202 0
 17198  17199 -17200 -55 -17203 0

c  2+1 --> break 
c    (-b^{55, 1}_2 ∧  b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧  p_55) -> break
c  in CNF:
c     b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ -p_55 ∨ break
c  in DIMACS:
 17198 -17199  17200 -55 1162 0


c  2-1 --> 1
c    (-b^{55, 1}_2 ∧  b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧ -p_55) -> (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0)
c  in CNF:
c     b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_2
c     b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_1
c     b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨  b^{55, 2}_0
c  in DIMACS:
 17198 -17199  17200  55 -17201 0
 17198 -17199  17200  55 -17202 0
 17198 -17199  17200  55  17203 0

c  1-1 --> 0
c    (-b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧  b^{55, 1}_0 ∧ -p_55) -> (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧ -b^{55, 2}_0)
c  in CNF:
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_2
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_1
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_0
c  in DIMACS:
 17198  17199 -17200  55 -17201 0
 17198  17199 -17200  55 -17202 0
 17198  17199 -17200  55 -17203 0

c  0-1 --> -1
c    (-b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧ -p_55) -> ( b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0)
c  in CNF:
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨  b^{55, 2}_2
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_1
c     b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨  b^{55, 2}_0
c  in DIMACS:
 17198  17199  17200  55  17201 0
 17198  17199  17200  55 -17202 0
 17198  17199  17200  55  17203 0

c  -1-1 --> -2
c    ( b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧  b^{55, 1}_0 ∧ -p_55) -> ( b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0)
c  in CNF:
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨  b^{55, 2}_2
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨  b^{55, 2}_1
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨  p_55 ∨ -b^{55, 2}_0
c  in DIMACS:
-17198  17199 -17200  55  17201 0
-17198  17199 -17200  55  17202 0
-17198  17199 -17200  55 -17203 0

c  -2-1 --> break 
c    ( b^{55, 1}_2 ∧  b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧ -p_55) -> break
c  in CNF:
c    -b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨  b^{55, 1}_0 ∨  p_55 ∨ break
c  in DIMACS:
-17198 -17199  17200  55 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 1}_2 ∧ -b^{55, 1}_1 ∧ -b^{55, 1}_0 ∧ true) 
c  in CNF:
c    -b^{55, 1}_2 ∨  b^{55, 1}_1 ∨  b^{55, 1}_0 ∨ false 
c  in DIMACS:
-17198  17199  17200  0

c  3 does not represent an automaton state.
c    -(-b^{55, 1}_2 ∧  b^{55, 1}_1 ∧  b^{55, 1}_0 ∧ true) 
c  in CNF:
c     b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ false 
c  in DIMACS:
 17198 -17199 -17200  0
c  -3 does not represent an automaton state.
c    -( b^{55, 1}_2 ∧  b^{55, 1}_1 ∧  b^{55, 1}_0 ∧ true) 
c  in CNF:
c    -b^{55, 1}_2 ∨ -b^{55, 1}_1 ∨ -b^{55, 1}_0 ∨ false 
c  in DIMACS:
-17198 -17199 -17200  0

c i = 2
c  -2+1 --> -1
c    ( b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧  p_110) -> ( b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0)
c  in CNF:
c    -b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨  b^{55, 3}_2
c    -b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_1
c    -b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨  b^{55, 3}_0
c  in DIMACS:
-17201 -17202  17203 -110  17204 0
-17201 -17202  17203 -110 -17205 0
-17201 -17202  17203 -110  17206 0

c  -1+1 --> 0
c    ( b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0 ∧  p_110) -> (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧ -b^{55, 3}_0)
c  in CNF:
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_2
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_1
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_0
c  in DIMACS:
-17201  17202 -17203 -110 -17204 0
-17201  17202 -17203 -110 -17205 0
-17201  17202 -17203 -110 -17206 0

c  0+1 --> 1
c    (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧  p_110) -> (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0)
c  in CNF:
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_2
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_1
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨  b^{55, 3}_0
c  in DIMACS:
 17201  17202  17203 -110 -17204 0
 17201  17202  17203 -110 -17205 0
 17201  17202  17203 -110  17206 0

c  1+1 --> 2
c    (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0 ∧  p_110) -> (-b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0)
c  in CNF:
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_2
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨  b^{55, 3}_1
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ -p_110 ∨ -b^{55, 3}_0
c  in DIMACS:
 17201  17202 -17203 -110 -17204 0
 17201  17202 -17203 -110  17205 0
 17201  17202 -17203 -110 -17206 0

c  2+1 --> break 
c    (-b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧  p_110) -> break
c  in CNF:
c     b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 17201 -17202  17203 -110 1162 0


c  2-1 --> 1
c    (-b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧ -p_110) -> (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0)
c  in CNF:
c     b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_2
c     b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_1
c     b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨  b^{55, 3}_0
c  in DIMACS:
 17201 -17202  17203  110 -17204 0
 17201 -17202  17203  110 -17205 0
 17201 -17202  17203  110  17206 0

c  1-1 --> 0
c    (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0 ∧ -p_110) -> (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧ -b^{55, 3}_0)
c  in CNF:
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_2
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_1
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_0
c  in DIMACS:
 17201  17202 -17203  110 -17204 0
 17201  17202 -17203  110 -17205 0
 17201  17202 -17203  110 -17206 0

c  0-1 --> -1
c    (-b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧ -p_110) -> ( b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0)
c  in CNF:
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨  b^{55, 3}_2
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_1
c     b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨  b^{55, 3}_0
c  in DIMACS:
 17201  17202  17203  110  17204 0
 17201  17202  17203  110 -17205 0
 17201  17202  17203  110  17206 0

c  -1-1 --> -2
c    ( b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧  b^{55, 2}_0 ∧ -p_110) -> ( b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0)
c  in CNF:
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨  b^{55, 3}_2
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨  b^{55, 3}_1
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨  p_110 ∨ -b^{55, 3}_0
c  in DIMACS:
-17201  17202 -17203  110  17204 0
-17201  17202 -17203  110  17205 0
-17201  17202 -17203  110 -17206 0

c  -2-1 --> break 
c    ( b^{55, 2}_2 ∧  b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨  b^{55, 2}_0 ∨  p_110 ∨ break
c  in DIMACS:
-17201 -17202  17203  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 2}_2 ∧ -b^{55, 2}_1 ∧ -b^{55, 2}_0 ∧ true) 
c  in CNF:
c    -b^{55, 2}_2 ∨  b^{55, 2}_1 ∨  b^{55, 2}_0 ∨ false 
c  in DIMACS:
-17201  17202  17203  0

c  3 does not represent an automaton state.
c    -(-b^{55, 2}_2 ∧  b^{55, 2}_1 ∧  b^{55, 2}_0 ∧ true) 
c  in CNF:
c     b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ false 
c  in DIMACS:
 17201 -17202 -17203  0
c  -3 does not represent an automaton state.
c    -( b^{55, 2}_2 ∧  b^{55, 2}_1 ∧  b^{55, 2}_0 ∧ true) 
c  in CNF:
c    -b^{55, 2}_2 ∨ -b^{55, 2}_1 ∨ -b^{55, 2}_0 ∨ false 
c  in DIMACS:
-17201 -17202 -17203  0

c i = 3
c  -2+1 --> -1
c    ( b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧  p_165) -> ( b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0)
c  in CNF:
c    -b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨  b^{55, 4}_2
c    -b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_1
c    -b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨  b^{55, 4}_0
c  in DIMACS:
-17204 -17205  17206 -165  17207 0
-17204 -17205  17206 -165 -17208 0
-17204 -17205  17206 -165  17209 0

c  -1+1 --> 0
c    ( b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0 ∧  p_165) -> (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧ -b^{55, 4}_0)
c  in CNF:
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_2
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_1
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_0
c  in DIMACS:
-17204  17205 -17206 -165 -17207 0
-17204  17205 -17206 -165 -17208 0
-17204  17205 -17206 -165 -17209 0

c  0+1 --> 1
c    (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧  p_165) -> (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0)
c  in CNF:
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_2
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_1
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨  b^{55, 4}_0
c  in DIMACS:
 17204  17205  17206 -165 -17207 0
 17204  17205  17206 -165 -17208 0
 17204  17205  17206 -165  17209 0

c  1+1 --> 2
c    (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0 ∧  p_165) -> (-b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0)
c  in CNF:
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_2
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨  b^{55, 4}_1
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ -p_165 ∨ -b^{55, 4}_0
c  in DIMACS:
 17204  17205 -17206 -165 -17207 0
 17204  17205 -17206 -165  17208 0
 17204  17205 -17206 -165 -17209 0

c  2+1 --> break 
c    (-b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧  p_165) -> break
c  in CNF:
c     b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 17204 -17205  17206 -165 1162 0


c  2-1 --> 1
c    (-b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧ -p_165) -> (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0)
c  in CNF:
c     b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_2
c     b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_1
c     b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨  b^{55, 4}_0
c  in DIMACS:
 17204 -17205  17206  165 -17207 0
 17204 -17205  17206  165 -17208 0
 17204 -17205  17206  165  17209 0

c  1-1 --> 0
c    (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0 ∧ -p_165) -> (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧ -b^{55, 4}_0)
c  in CNF:
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_2
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_1
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_0
c  in DIMACS:
 17204  17205 -17206  165 -17207 0
 17204  17205 -17206  165 -17208 0
 17204  17205 -17206  165 -17209 0

c  0-1 --> -1
c    (-b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧ -p_165) -> ( b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0)
c  in CNF:
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨  b^{55, 4}_2
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_1
c     b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨  b^{55, 4}_0
c  in DIMACS:
 17204  17205  17206  165  17207 0
 17204  17205  17206  165 -17208 0
 17204  17205  17206  165  17209 0

c  -1-1 --> -2
c    ( b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧  b^{55, 3}_0 ∧ -p_165) -> ( b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0)
c  in CNF:
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨  b^{55, 4}_2
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨  b^{55, 4}_1
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨  p_165 ∨ -b^{55, 4}_0
c  in DIMACS:
-17204  17205 -17206  165  17207 0
-17204  17205 -17206  165  17208 0
-17204  17205 -17206  165 -17209 0

c  -2-1 --> break 
c    ( b^{55, 3}_2 ∧  b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨  b^{55, 3}_0 ∨  p_165 ∨ break
c  in DIMACS:
-17204 -17205  17206  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 3}_2 ∧ -b^{55, 3}_1 ∧ -b^{55, 3}_0 ∧ true) 
c  in CNF:
c    -b^{55, 3}_2 ∨  b^{55, 3}_1 ∨  b^{55, 3}_0 ∨ false 
c  in DIMACS:
-17204  17205  17206  0

c  3 does not represent an automaton state.
c    -(-b^{55, 3}_2 ∧  b^{55, 3}_1 ∧  b^{55, 3}_0 ∧ true) 
c  in CNF:
c     b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ false 
c  in DIMACS:
 17204 -17205 -17206  0
c  -3 does not represent an automaton state.
c    -( b^{55, 3}_2 ∧  b^{55, 3}_1 ∧  b^{55, 3}_0 ∧ true) 
c  in CNF:
c    -b^{55, 3}_2 ∨ -b^{55, 3}_1 ∨ -b^{55, 3}_0 ∨ false 
c  in DIMACS:
-17204 -17205 -17206  0

c i = 4
c  -2+1 --> -1
c    ( b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧  p_220) -> ( b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0)
c  in CNF:
c    -b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨  b^{55, 5}_2
c    -b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_1
c    -b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨  b^{55, 5}_0
c  in DIMACS:
-17207 -17208  17209 -220  17210 0
-17207 -17208  17209 -220 -17211 0
-17207 -17208  17209 -220  17212 0

c  -1+1 --> 0
c    ( b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0 ∧  p_220) -> (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧ -b^{55, 5}_0)
c  in CNF:
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_2
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_1
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_0
c  in DIMACS:
-17207  17208 -17209 -220 -17210 0
-17207  17208 -17209 -220 -17211 0
-17207  17208 -17209 -220 -17212 0

c  0+1 --> 1
c    (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧  p_220) -> (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0)
c  in CNF:
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_2
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_1
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨  b^{55, 5}_0
c  in DIMACS:
 17207  17208  17209 -220 -17210 0
 17207  17208  17209 -220 -17211 0
 17207  17208  17209 -220  17212 0

c  1+1 --> 2
c    (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0 ∧  p_220) -> (-b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0)
c  in CNF:
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_2
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨  b^{55, 5}_1
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ -p_220 ∨ -b^{55, 5}_0
c  in DIMACS:
 17207  17208 -17209 -220 -17210 0
 17207  17208 -17209 -220  17211 0
 17207  17208 -17209 -220 -17212 0

c  2+1 --> break 
c    (-b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧  p_220) -> break
c  in CNF:
c     b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 17207 -17208  17209 -220 1162 0


c  2-1 --> 1
c    (-b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧ -p_220) -> (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0)
c  in CNF:
c     b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_2
c     b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_1
c     b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨  b^{55, 5}_0
c  in DIMACS:
 17207 -17208  17209  220 -17210 0
 17207 -17208  17209  220 -17211 0
 17207 -17208  17209  220  17212 0

c  1-1 --> 0
c    (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0 ∧ -p_220) -> (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧ -b^{55, 5}_0)
c  in CNF:
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_2
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_1
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_0
c  in DIMACS:
 17207  17208 -17209  220 -17210 0
 17207  17208 -17209  220 -17211 0
 17207  17208 -17209  220 -17212 0

c  0-1 --> -1
c    (-b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧ -p_220) -> ( b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0)
c  in CNF:
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨  b^{55, 5}_2
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_1
c     b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨  b^{55, 5}_0
c  in DIMACS:
 17207  17208  17209  220  17210 0
 17207  17208  17209  220 -17211 0
 17207  17208  17209  220  17212 0

c  -1-1 --> -2
c    ( b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧  b^{55, 4}_0 ∧ -p_220) -> ( b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0)
c  in CNF:
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨  b^{55, 5}_2
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨  b^{55, 5}_1
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨  p_220 ∨ -b^{55, 5}_0
c  in DIMACS:
-17207  17208 -17209  220  17210 0
-17207  17208 -17209  220  17211 0
-17207  17208 -17209  220 -17212 0

c  -2-1 --> break 
c    ( b^{55, 4}_2 ∧  b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨  b^{55, 4}_0 ∨  p_220 ∨ break
c  in DIMACS:
-17207 -17208  17209  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 4}_2 ∧ -b^{55, 4}_1 ∧ -b^{55, 4}_0 ∧ true) 
c  in CNF:
c    -b^{55, 4}_2 ∨  b^{55, 4}_1 ∨  b^{55, 4}_0 ∨ false 
c  in DIMACS:
-17207  17208  17209  0

c  3 does not represent an automaton state.
c    -(-b^{55, 4}_2 ∧  b^{55, 4}_1 ∧  b^{55, 4}_0 ∧ true) 
c  in CNF:
c     b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ false 
c  in DIMACS:
 17207 -17208 -17209  0
c  -3 does not represent an automaton state.
c    -( b^{55, 4}_2 ∧  b^{55, 4}_1 ∧  b^{55, 4}_0 ∧ true) 
c  in CNF:
c    -b^{55, 4}_2 ∨ -b^{55, 4}_1 ∨ -b^{55, 4}_0 ∨ false 
c  in DIMACS:
-17207 -17208 -17209  0

c i = 5
c  -2+1 --> -1
c    ( b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧  p_275) -> ( b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0)
c  in CNF:
c    -b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨  b^{55, 6}_2
c    -b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_1
c    -b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨  b^{55, 6}_0
c  in DIMACS:
-17210 -17211  17212 -275  17213 0
-17210 -17211  17212 -275 -17214 0
-17210 -17211  17212 -275  17215 0

c  -1+1 --> 0
c    ( b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0 ∧  p_275) -> (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧ -b^{55, 6}_0)
c  in CNF:
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_2
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_1
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_0
c  in DIMACS:
-17210  17211 -17212 -275 -17213 0
-17210  17211 -17212 -275 -17214 0
-17210  17211 -17212 -275 -17215 0

c  0+1 --> 1
c    (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧  p_275) -> (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0)
c  in CNF:
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_2
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_1
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨  b^{55, 6}_0
c  in DIMACS:
 17210  17211  17212 -275 -17213 0
 17210  17211  17212 -275 -17214 0
 17210  17211  17212 -275  17215 0

c  1+1 --> 2
c    (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0 ∧  p_275) -> (-b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0)
c  in CNF:
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_2
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨  b^{55, 6}_1
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ -p_275 ∨ -b^{55, 6}_0
c  in DIMACS:
 17210  17211 -17212 -275 -17213 0
 17210  17211 -17212 -275  17214 0
 17210  17211 -17212 -275 -17215 0

c  2+1 --> break 
c    (-b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧  p_275) -> break
c  in CNF:
c     b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 17210 -17211  17212 -275 1162 0


c  2-1 --> 1
c    (-b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧ -p_275) -> (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0)
c  in CNF:
c     b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_2
c     b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_1
c     b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨  b^{55, 6}_0
c  in DIMACS:
 17210 -17211  17212  275 -17213 0
 17210 -17211  17212  275 -17214 0
 17210 -17211  17212  275  17215 0

c  1-1 --> 0
c    (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0 ∧ -p_275) -> (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧ -b^{55, 6}_0)
c  in CNF:
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_2
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_1
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_0
c  in DIMACS:
 17210  17211 -17212  275 -17213 0
 17210  17211 -17212  275 -17214 0
 17210  17211 -17212  275 -17215 0

c  0-1 --> -1
c    (-b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧ -p_275) -> ( b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0)
c  in CNF:
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨  b^{55, 6}_2
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_1
c     b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨  b^{55, 6}_0
c  in DIMACS:
 17210  17211  17212  275  17213 0
 17210  17211  17212  275 -17214 0
 17210  17211  17212  275  17215 0

c  -1-1 --> -2
c    ( b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧  b^{55, 5}_0 ∧ -p_275) -> ( b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0)
c  in CNF:
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨  b^{55, 6}_2
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨  b^{55, 6}_1
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨  p_275 ∨ -b^{55, 6}_0
c  in DIMACS:
-17210  17211 -17212  275  17213 0
-17210  17211 -17212  275  17214 0
-17210  17211 -17212  275 -17215 0

c  -2-1 --> break 
c    ( b^{55, 5}_2 ∧  b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨  b^{55, 5}_0 ∨  p_275 ∨ break
c  in DIMACS:
-17210 -17211  17212  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 5}_2 ∧ -b^{55, 5}_1 ∧ -b^{55, 5}_0 ∧ true) 
c  in CNF:
c    -b^{55, 5}_2 ∨  b^{55, 5}_1 ∨  b^{55, 5}_0 ∨ false 
c  in DIMACS:
-17210  17211  17212  0

c  3 does not represent an automaton state.
c    -(-b^{55, 5}_2 ∧  b^{55, 5}_1 ∧  b^{55, 5}_0 ∧ true) 
c  in CNF:
c     b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ false 
c  in DIMACS:
 17210 -17211 -17212  0
c  -3 does not represent an automaton state.
c    -( b^{55, 5}_2 ∧  b^{55, 5}_1 ∧  b^{55, 5}_0 ∧ true) 
c  in CNF:
c    -b^{55, 5}_2 ∨ -b^{55, 5}_1 ∨ -b^{55, 5}_0 ∨ false 
c  in DIMACS:
-17210 -17211 -17212  0

c i = 6
c  -2+1 --> -1
c    ( b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧  p_330) -> ( b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0)
c  in CNF:
c    -b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨  b^{55, 7}_2
c    -b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_1
c    -b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨  b^{55, 7}_0
c  in DIMACS:
-17213 -17214  17215 -330  17216 0
-17213 -17214  17215 -330 -17217 0
-17213 -17214  17215 -330  17218 0

c  -1+1 --> 0
c    ( b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0 ∧  p_330) -> (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧ -b^{55, 7}_0)
c  in CNF:
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_2
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_1
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_0
c  in DIMACS:
-17213  17214 -17215 -330 -17216 0
-17213  17214 -17215 -330 -17217 0
-17213  17214 -17215 -330 -17218 0

c  0+1 --> 1
c    (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧  p_330) -> (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0)
c  in CNF:
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_2
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_1
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨  b^{55, 7}_0
c  in DIMACS:
 17213  17214  17215 -330 -17216 0
 17213  17214  17215 -330 -17217 0
 17213  17214  17215 -330  17218 0

c  1+1 --> 2
c    (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0 ∧  p_330) -> (-b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0)
c  in CNF:
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_2
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨  b^{55, 7}_1
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ -p_330 ∨ -b^{55, 7}_0
c  in DIMACS:
 17213  17214 -17215 -330 -17216 0
 17213  17214 -17215 -330  17217 0
 17213  17214 -17215 -330 -17218 0

c  2+1 --> break 
c    (-b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧  p_330) -> break
c  in CNF:
c     b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 17213 -17214  17215 -330 1162 0


c  2-1 --> 1
c    (-b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧ -p_330) -> (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0)
c  in CNF:
c     b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_2
c     b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_1
c     b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨  b^{55, 7}_0
c  in DIMACS:
 17213 -17214  17215  330 -17216 0
 17213 -17214  17215  330 -17217 0
 17213 -17214  17215  330  17218 0

c  1-1 --> 0
c    (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0 ∧ -p_330) -> (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧ -b^{55, 7}_0)
c  in CNF:
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_2
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_1
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_0
c  in DIMACS:
 17213  17214 -17215  330 -17216 0
 17213  17214 -17215  330 -17217 0
 17213  17214 -17215  330 -17218 0

c  0-1 --> -1
c    (-b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧ -p_330) -> ( b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0)
c  in CNF:
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨  b^{55, 7}_2
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_1
c     b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨  b^{55, 7}_0
c  in DIMACS:
 17213  17214  17215  330  17216 0
 17213  17214  17215  330 -17217 0
 17213  17214  17215  330  17218 0

c  -1-1 --> -2
c    ( b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧  b^{55, 6}_0 ∧ -p_330) -> ( b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0)
c  in CNF:
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨  b^{55, 7}_2
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨  b^{55, 7}_1
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨  p_330 ∨ -b^{55, 7}_0
c  in DIMACS:
-17213  17214 -17215  330  17216 0
-17213  17214 -17215  330  17217 0
-17213  17214 -17215  330 -17218 0

c  -2-1 --> break 
c    ( b^{55, 6}_2 ∧  b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨  b^{55, 6}_0 ∨  p_330 ∨ break
c  in DIMACS:
-17213 -17214  17215  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 6}_2 ∧ -b^{55, 6}_1 ∧ -b^{55, 6}_0 ∧ true) 
c  in CNF:
c    -b^{55, 6}_2 ∨  b^{55, 6}_1 ∨  b^{55, 6}_0 ∨ false 
c  in DIMACS:
-17213  17214  17215  0

c  3 does not represent an automaton state.
c    -(-b^{55, 6}_2 ∧  b^{55, 6}_1 ∧  b^{55, 6}_0 ∧ true) 
c  in CNF:
c     b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ false 
c  in DIMACS:
 17213 -17214 -17215  0
c  -3 does not represent an automaton state.
c    -( b^{55, 6}_2 ∧  b^{55, 6}_1 ∧  b^{55, 6}_0 ∧ true) 
c  in CNF:
c    -b^{55, 6}_2 ∨ -b^{55, 6}_1 ∨ -b^{55, 6}_0 ∨ false 
c  in DIMACS:
-17213 -17214 -17215  0

c i = 7
c  -2+1 --> -1
c    ( b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧  p_385) -> ( b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0)
c  in CNF:
c    -b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨  b^{55, 8}_2
c    -b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_1
c    -b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨  b^{55, 8}_0
c  in DIMACS:
-17216 -17217  17218 -385  17219 0
-17216 -17217  17218 -385 -17220 0
-17216 -17217  17218 -385  17221 0

c  -1+1 --> 0
c    ( b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0 ∧  p_385) -> (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧ -b^{55, 8}_0)
c  in CNF:
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_2
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_1
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_0
c  in DIMACS:
-17216  17217 -17218 -385 -17219 0
-17216  17217 -17218 -385 -17220 0
-17216  17217 -17218 -385 -17221 0

c  0+1 --> 1
c    (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧  p_385) -> (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0)
c  in CNF:
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_2
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_1
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨  b^{55, 8}_0
c  in DIMACS:
 17216  17217  17218 -385 -17219 0
 17216  17217  17218 -385 -17220 0
 17216  17217  17218 -385  17221 0

c  1+1 --> 2
c    (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0 ∧  p_385) -> (-b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0)
c  in CNF:
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_2
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨  b^{55, 8}_1
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ -p_385 ∨ -b^{55, 8}_0
c  in DIMACS:
 17216  17217 -17218 -385 -17219 0
 17216  17217 -17218 -385  17220 0
 17216  17217 -17218 -385 -17221 0

c  2+1 --> break 
c    (-b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧  p_385) -> break
c  in CNF:
c     b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 17216 -17217  17218 -385 1162 0


c  2-1 --> 1
c    (-b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧ -p_385) -> (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0)
c  in CNF:
c     b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_2
c     b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_1
c     b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨  b^{55, 8}_0
c  in DIMACS:
 17216 -17217  17218  385 -17219 0
 17216 -17217  17218  385 -17220 0
 17216 -17217  17218  385  17221 0

c  1-1 --> 0
c    (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0 ∧ -p_385) -> (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧ -b^{55, 8}_0)
c  in CNF:
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_2
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_1
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_0
c  in DIMACS:
 17216  17217 -17218  385 -17219 0
 17216  17217 -17218  385 -17220 0
 17216  17217 -17218  385 -17221 0

c  0-1 --> -1
c    (-b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧ -p_385) -> ( b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0)
c  in CNF:
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨  b^{55, 8}_2
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_1
c     b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨  b^{55, 8}_0
c  in DIMACS:
 17216  17217  17218  385  17219 0
 17216  17217  17218  385 -17220 0
 17216  17217  17218  385  17221 0

c  -1-1 --> -2
c    ( b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧  b^{55, 7}_0 ∧ -p_385) -> ( b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0)
c  in CNF:
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨  b^{55, 8}_2
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨  b^{55, 8}_1
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨  p_385 ∨ -b^{55, 8}_0
c  in DIMACS:
-17216  17217 -17218  385  17219 0
-17216  17217 -17218  385  17220 0
-17216  17217 -17218  385 -17221 0

c  -2-1 --> break 
c    ( b^{55, 7}_2 ∧  b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨  b^{55, 7}_0 ∨  p_385 ∨ break
c  in DIMACS:
-17216 -17217  17218  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 7}_2 ∧ -b^{55, 7}_1 ∧ -b^{55, 7}_0 ∧ true) 
c  in CNF:
c    -b^{55, 7}_2 ∨  b^{55, 7}_1 ∨  b^{55, 7}_0 ∨ false 
c  in DIMACS:
-17216  17217  17218  0

c  3 does not represent an automaton state.
c    -(-b^{55, 7}_2 ∧  b^{55, 7}_1 ∧  b^{55, 7}_0 ∧ true) 
c  in CNF:
c     b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ false 
c  in DIMACS:
 17216 -17217 -17218  0
c  -3 does not represent an automaton state.
c    -( b^{55, 7}_2 ∧  b^{55, 7}_1 ∧  b^{55, 7}_0 ∧ true) 
c  in CNF:
c    -b^{55, 7}_2 ∨ -b^{55, 7}_1 ∨ -b^{55, 7}_0 ∨ false 
c  in DIMACS:
-17216 -17217 -17218  0

c i = 8
c  -2+1 --> -1
c    ( b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧  p_440) -> ( b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0)
c  in CNF:
c    -b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨  b^{55, 9}_2
c    -b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_1
c    -b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨  b^{55, 9}_0
c  in DIMACS:
-17219 -17220  17221 -440  17222 0
-17219 -17220  17221 -440 -17223 0
-17219 -17220  17221 -440  17224 0

c  -1+1 --> 0
c    ( b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0 ∧  p_440) -> (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧ -b^{55, 9}_0)
c  in CNF:
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_2
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_1
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_0
c  in DIMACS:
-17219  17220 -17221 -440 -17222 0
-17219  17220 -17221 -440 -17223 0
-17219  17220 -17221 -440 -17224 0

c  0+1 --> 1
c    (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧  p_440) -> (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0)
c  in CNF:
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_2
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_1
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨  b^{55, 9}_0
c  in DIMACS:
 17219  17220  17221 -440 -17222 0
 17219  17220  17221 -440 -17223 0
 17219  17220  17221 -440  17224 0

c  1+1 --> 2
c    (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0 ∧  p_440) -> (-b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0)
c  in CNF:
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_2
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨  b^{55, 9}_1
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ -p_440 ∨ -b^{55, 9}_0
c  in DIMACS:
 17219  17220 -17221 -440 -17222 0
 17219  17220 -17221 -440  17223 0
 17219  17220 -17221 -440 -17224 0

c  2+1 --> break 
c    (-b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧  p_440) -> break
c  in CNF:
c     b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 17219 -17220  17221 -440 1162 0


c  2-1 --> 1
c    (-b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧ -p_440) -> (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0)
c  in CNF:
c     b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_2
c     b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_1
c     b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨  b^{55, 9}_0
c  in DIMACS:
 17219 -17220  17221  440 -17222 0
 17219 -17220  17221  440 -17223 0
 17219 -17220  17221  440  17224 0

c  1-1 --> 0
c    (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0 ∧ -p_440) -> (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧ -b^{55, 9}_0)
c  in CNF:
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_2
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_1
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_0
c  in DIMACS:
 17219  17220 -17221  440 -17222 0
 17219  17220 -17221  440 -17223 0
 17219  17220 -17221  440 -17224 0

c  0-1 --> -1
c    (-b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧ -p_440) -> ( b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0)
c  in CNF:
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨  b^{55, 9}_2
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_1
c     b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨  b^{55, 9}_0
c  in DIMACS:
 17219  17220  17221  440  17222 0
 17219  17220  17221  440 -17223 0
 17219  17220  17221  440  17224 0

c  -1-1 --> -2
c    ( b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧  b^{55, 8}_0 ∧ -p_440) -> ( b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0)
c  in CNF:
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨  b^{55, 9}_2
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨  b^{55, 9}_1
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨  p_440 ∨ -b^{55, 9}_0
c  in DIMACS:
-17219  17220 -17221  440  17222 0
-17219  17220 -17221  440  17223 0
-17219  17220 -17221  440 -17224 0

c  -2-1 --> break 
c    ( b^{55, 8}_2 ∧  b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨  b^{55, 8}_0 ∨  p_440 ∨ break
c  in DIMACS:
-17219 -17220  17221  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 8}_2 ∧ -b^{55, 8}_1 ∧ -b^{55, 8}_0 ∧ true) 
c  in CNF:
c    -b^{55, 8}_2 ∨  b^{55, 8}_1 ∨  b^{55, 8}_0 ∨ false 
c  in DIMACS:
-17219  17220  17221  0

c  3 does not represent an automaton state.
c    -(-b^{55, 8}_2 ∧  b^{55, 8}_1 ∧  b^{55, 8}_0 ∧ true) 
c  in CNF:
c     b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ false 
c  in DIMACS:
 17219 -17220 -17221  0
c  -3 does not represent an automaton state.
c    -( b^{55, 8}_2 ∧  b^{55, 8}_1 ∧  b^{55, 8}_0 ∧ true) 
c  in CNF:
c    -b^{55, 8}_2 ∨ -b^{55, 8}_1 ∨ -b^{55, 8}_0 ∨ false 
c  in DIMACS:
-17219 -17220 -17221  0

c i = 9
c  -2+1 --> -1
c    ( b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧  p_495) -> ( b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0)
c  in CNF:
c    -b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨  b^{55, 10}_2
c    -b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_1
c    -b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨  b^{55, 10}_0
c  in DIMACS:
-17222 -17223  17224 -495  17225 0
-17222 -17223  17224 -495 -17226 0
-17222 -17223  17224 -495  17227 0

c  -1+1 --> 0
c    ( b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0 ∧  p_495) -> (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧ -b^{55, 10}_0)
c  in CNF:
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_2
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_1
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_0
c  in DIMACS:
-17222  17223 -17224 -495 -17225 0
-17222  17223 -17224 -495 -17226 0
-17222  17223 -17224 -495 -17227 0

c  0+1 --> 1
c    (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧  p_495) -> (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0)
c  in CNF:
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_2
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_1
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨  b^{55, 10}_0
c  in DIMACS:
 17222  17223  17224 -495 -17225 0
 17222  17223  17224 -495 -17226 0
 17222  17223  17224 -495  17227 0

c  1+1 --> 2
c    (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0 ∧  p_495) -> (-b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0)
c  in CNF:
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_2
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨  b^{55, 10}_1
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ -p_495 ∨ -b^{55, 10}_0
c  in DIMACS:
 17222  17223 -17224 -495 -17225 0
 17222  17223 -17224 -495  17226 0
 17222  17223 -17224 -495 -17227 0

c  2+1 --> break 
c    (-b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧  p_495) -> break
c  in CNF:
c     b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 17222 -17223  17224 -495 1162 0


c  2-1 --> 1
c    (-b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧ -p_495) -> (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0)
c  in CNF:
c     b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_2
c     b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_1
c     b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨  b^{55, 10}_0
c  in DIMACS:
 17222 -17223  17224  495 -17225 0
 17222 -17223  17224  495 -17226 0
 17222 -17223  17224  495  17227 0

c  1-1 --> 0
c    (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0 ∧ -p_495) -> (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧ -b^{55, 10}_0)
c  in CNF:
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_2
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_1
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_0
c  in DIMACS:
 17222  17223 -17224  495 -17225 0
 17222  17223 -17224  495 -17226 0
 17222  17223 -17224  495 -17227 0

c  0-1 --> -1
c    (-b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧ -p_495) -> ( b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0)
c  in CNF:
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨  b^{55, 10}_2
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_1
c     b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨  b^{55, 10}_0
c  in DIMACS:
 17222  17223  17224  495  17225 0
 17222  17223  17224  495 -17226 0
 17222  17223  17224  495  17227 0

c  -1-1 --> -2
c    ( b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧  b^{55, 9}_0 ∧ -p_495) -> ( b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0)
c  in CNF:
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨  b^{55, 10}_2
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨  b^{55, 10}_1
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨  p_495 ∨ -b^{55, 10}_0
c  in DIMACS:
-17222  17223 -17224  495  17225 0
-17222  17223 -17224  495  17226 0
-17222  17223 -17224  495 -17227 0

c  -2-1 --> break 
c    ( b^{55, 9}_2 ∧  b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨  b^{55, 9}_0 ∨  p_495 ∨ break
c  in DIMACS:
-17222 -17223  17224  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 9}_2 ∧ -b^{55, 9}_1 ∧ -b^{55, 9}_0 ∧ true) 
c  in CNF:
c    -b^{55, 9}_2 ∨  b^{55, 9}_1 ∨  b^{55, 9}_0 ∨ false 
c  in DIMACS:
-17222  17223  17224  0

c  3 does not represent an automaton state.
c    -(-b^{55, 9}_2 ∧  b^{55, 9}_1 ∧  b^{55, 9}_0 ∧ true) 
c  in CNF:
c     b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ false 
c  in DIMACS:
 17222 -17223 -17224  0
c  -3 does not represent an automaton state.
c    -( b^{55, 9}_2 ∧  b^{55, 9}_1 ∧  b^{55, 9}_0 ∧ true) 
c  in CNF:
c    -b^{55, 9}_2 ∨ -b^{55, 9}_1 ∨ -b^{55, 9}_0 ∨ false 
c  in DIMACS:
-17222 -17223 -17224  0

c i = 10
c  -2+1 --> -1
c    ( b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧  p_550) -> ( b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0)
c  in CNF:
c    -b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨  b^{55, 11}_2
c    -b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_1
c    -b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨  b^{55, 11}_0
c  in DIMACS:
-17225 -17226  17227 -550  17228 0
-17225 -17226  17227 -550 -17229 0
-17225 -17226  17227 -550  17230 0

c  -1+1 --> 0
c    ( b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0 ∧  p_550) -> (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧ -b^{55, 11}_0)
c  in CNF:
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_2
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_1
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_0
c  in DIMACS:
-17225  17226 -17227 -550 -17228 0
-17225  17226 -17227 -550 -17229 0
-17225  17226 -17227 -550 -17230 0

c  0+1 --> 1
c    (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧  p_550) -> (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0)
c  in CNF:
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_2
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_1
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨  b^{55, 11}_0
c  in DIMACS:
 17225  17226  17227 -550 -17228 0
 17225  17226  17227 -550 -17229 0
 17225  17226  17227 -550  17230 0

c  1+1 --> 2
c    (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0 ∧  p_550) -> (-b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0)
c  in CNF:
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_2
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨  b^{55, 11}_1
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ -p_550 ∨ -b^{55, 11}_0
c  in DIMACS:
 17225  17226 -17227 -550 -17228 0
 17225  17226 -17227 -550  17229 0
 17225  17226 -17227 -550 -17230 0

c  2+1 --> break 
c    (-b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧  p_550) -> break
c  in CNF:
c     b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 17225 -17226  17227 -550 1162 0


c  2-1 --> 1
c    (-b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧ -p_550) -> (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0)
c  in CNF:
c     b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_2
c     b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_1
c     b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨  b^{55, 11}_0
c  in DIMACS:
 17225 -17226  17227  550 -17228 0
 17225 -17226  17227  550 -17229 0
 17225 -17226  17227  550  17230 0

c  1-1 --> 0
c    (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0 ∧ -p_550) -> (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧ -b^{55, 11}_0)
c  in CNF:
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_2
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_1
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_0
c  in DIMACS:
 17225  17226 -17227  550 -17228 0
 17225  17226 -17227  550 -17229 0
 17225  17226 -17227  550 -17230 0

c  0-1 --> -1
c    (-b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧ -p_550) -> ( b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0)
c  in CNF:
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨  b^{55, 11}_2
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_1
c     b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨  b^{55, 11}_0
c  in DIMACS:
 17225  17226  17227  550  17228 0
 17225  17226  17227  550 -17229 0
 17225  17226  17227  550  17230 0

c  -1-1 --> -2
c    ( b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧  b^{55, 10}_0 ∧ -p_550) -> ( b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0)
c  in CNF:
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨  b^{55, 11}_2
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨  b^{55, 11}_1
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨  p_550 ∨ -b^{55, 11}_0
c  in DIMACS:
-17225  17226 -17227  550  17228 0
-17225  17226 -17227  550  17229 0
-17225  17226 -17227  550 -17230 0

c  -2-1 --> break 
c    ( b^{55, 10}_2 ∧  b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨  b^{55, 10}_0 ∨  p_550 ∨ break
c  in DIMACS:
-17225 -17226  17227  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 10}_2 ∧ -b^{55, 10}_1 ∧ -b^{55, 10}_0 ∧ true) 
c  in CNF:
c    -b^{55, 10}_2 ∨  b^{55, 10}_1 ∨  b^{55, 10}_0 ∨ false 
c  in DIMACS:
-17225  17226  17227  0

c  3 does not represent an automaton state.
c    -(-b^{55, 10}_2 ∧  b^{55, 10}_1 ∧  b^{55, 10}_0 ∧ true) 
c  in CNF:
c     b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ false 
c  in DIMACS:
 17225 -17226 -17227  0
c  -3 does not represent an automaton state.
c    -( b^{55, 10}_2 ∧  b^{55, 10}_1 ∧  b^{55, 10}_0 ∧ true) 
c  in CNF:
c    -b^{55, 10}_2 ∨ -b^{55, 10}_1 ∨ -b^{55, 10}_0 ∨ false 
c  in DIMACS:
-17225 -17226 -17227  0

c i = 11
c  -2+1 --> -1
c    ( b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧  p_605) -> ( b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0)
c  in CNF:
c    -b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨  b^{55, 12}_2
c    -b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_1
c    -b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨  b^{55, 12}_0
c  in DIMACS:
-17228 -17229  17230 -605  17231 0
-17228 -17229  17230 -605 -17232 0
-17228 -17229  17230 -605  17233 0

c  -1+1 --> 0
c    ( b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0 ∧  p_605) -> (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧ -b^{55, 12}_0)
c  in CNF:
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_2
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_1
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_0
c  in DIMACS:
-17228  17229 -17230 -605 -17231 0
-17228  17229 -17230 -605 -17232 0
-17228  17229 -17230 -605 -17233 0

c  0+1 --> 1
c    (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧  p_605) -> (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0)
c  in CNF:
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_2
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_1
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨  b^{55, 12}_0
c  in DIMACS:
 17228  17229  17230 -605 -17231 0
 17228  17229  17230 -605 -17232 0
 17228  17229  17230 -605  17233 0

c  1+1 --> 2
c    (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0 ∧  p_605) -> (-b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0)
c  in CNF:
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_2
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨  b^{55, 12}_1
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ -p_605 ∨ -b^{55, 12}_0
c  in DIMACS:
 17228  17229 -17230 -605 -17231 0
 17228  17229 -17230 -605  17232 0
 17228  17229 -17230 -605 -17233 0

c  2+1 --> break 
c    (-b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧  p_605) -> break
c  in CNF:
c     b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ -p_605 ∨ break
c  in DIMACS:
 17228 -17229  17230 -605 1162 0


c  2-1 --> 1
c    (-b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧ -p_605) -> (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0)
c  in CNF:
c     b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_2
c     b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_1
c     b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨  b^{55, 12}_0
c  in DIMACS:
 17228 -17229  17230  605 -17231 0
 17228 -17229  17230  605 -17232 0
 17228 -17229  17230  605  17233 0

c  1-1 --> 0
c    (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0 ∧ -p_605) -> (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧ -b^{55, 12}_0)
c  in CNF:
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_2
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_1
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_0
c  in DIMACS:
 17228  17229 -17230  605 -17231 0
 17228  17229 -17230  605 -17232 0
 17228  17229 -17230  605 -17233 0

c  0-1 --> -1
c    (-b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧ -p_605) -> ( b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0)
c  in CNF:
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨  b^{55, 12}_2
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_1
c     b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨  b^{55, 12}_0
c  in DIMACS:
 17228  17229  17230  605  17231 0
 17228  17229  17230  605 -17232 0
 17228  17229  17230  605  17233 0

c  -1-1 --> -2
c    ( b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧  b^{55, 11}_0 ∧ -p_605) -> ( b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0)
c  in CNF:
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨  b^{55, 12}_2
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨  b^{55, 12}_1
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨  p_605 ∨ -b^{55, 12}_0
c  in DIMACS:
-17228  17229 -17230  605  17231 0
-17228  17229 -17230  605  17232 0
-17228  17229 -17230  605 -17233 0

c  -2-1 --> break 
c    ( b^{55, 11}_2 ∧  b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧ -p_605) -> break
c  in CNF:
c    -b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨  b^{55, 11}_0 ∨  p_605 ∨ break
c  in DIMACS:
-17228 -17229  17230  605 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 11}_2 ∧ -b^{55, 11}_1 ∧ -b^{55, 11}_0 ∧ true) 
c  in CNF:
c    -b^{55, 11}_2 ∨  b^{55, 11}_1 ∨  b^{55, 11}_0 ∨ false 
c  in DIMACS:
-17228  17229  17230  0

c  3 does not represent an automaton state.
c    -(-b^{55, 11}_2 ∧  b^{55, 11}_1 ∧  b^{55, 11}_0 ∧ true) 
c  in CNF:
c     b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ false 
c  in DIMACS:
 17228 -17229 -17230  0
c  -3 does not represent an automaton state.
c    -( b^{55, 11}_2 ∧  b^{55, 11}_1 ∧  b^{55, 11}_0 ∧ true) 
c  in CNF:
c    -b^{55, 11}_2 ∨ -b^{55, 11}_1 ∨ -b^{55, 11}_0 ∨ false 
c  in DIMACS:
-17228 -17229 -17230  0

c i = 12
c  -2+1 --> -1
c    ( b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧  p_660) -> ( b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0)
c  in CNF:
c    -b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨  b^{55, 13}_2
c    -b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_1
c    -b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨  b^{55, 13}_0
c  in DIMACS:
-17231 -17232  17233 -660  17234 0
-17231 -17232  17233 -660 -17235 0
-17231 -17232  17233 -660  17236 0

c  -1+1 --> 0
c    ( b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0 ∧  p_660) -> (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧ -b^{55, 13}_0)
c  in CNF:
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_2
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_1
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_0
c  in DIMACS:
-17231  17232 -17233 -660 -17234 0
-17231  17232 -17233 -660 -17235 0
-17231  17232 -17233 -660 -17236 0

c  0+1 --> 1
c    (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧  p_660) -> (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0)
c  in CNF:
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_2
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_1
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨  b^{55, 13}_0
c  in DIMACS:
 17231  17232  17233 -660 -17234 0
 17231  17232  17233 -660 -17235 0
 17231  17232  17233 -660  17236 0

c  1+1 --> 2
c    (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0 ∧  p_660) -> (-b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0)
c  in CNF:
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_2
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨  b^{55, 13}_1
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ -p_660 ∨ -b^{55, 13}_0
c  in DIMACS:
 17231  17232 -17233 -660 -17234 0
 17231  17232 -17233 -660  17235 0
 17231  17232 -17233 -660 -17236 0

c  2+1 --> break 
c    (-b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧  p_660) -> break
c  in CNF:
c     b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 17231 -17232  17233 -660 1162 0


c  2-1 --> 1
c    (-b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧ -p_660) -> (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0)
c  in CNF:
c     b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_2
c     b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_1
c     b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨  b^{55, 13}_0
c  in DIMACS:
 17231 -17232  17233  660 -17234 0
 17231 -17232  17233  660 -17235 0
 17231 -17232  17233  660  17236 0

c  1-1 --> 0
c    (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0 ∧ -p_660) -> (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧ -b^{55, 13}_0)
c  in CNF:
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_2
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_1
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_0
c  in DIMACS:
 17231  17232 -17233  660 -17234 0
 17231  17232 -17233  660 -17235 0
 17231  17232 -17233  660 -17236 0

c  0-1 --> -1
c    (-b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧ -p_660) -> ( b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0)
c  in CNF:
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨  b^{55, 13}_2
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_1
c     b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨  b^{55, 13}_0
c  in DIMACS:
 17231  17232  17233  660  17234 0
 17231  17232  17233  660 -17235 0
 17231  17232  17233  660  17236 0

c  -1-1 --> -2
c    ( b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧  b^{55, 12}_0 ∧ -p_660) -> ( b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0)
c  in CNF:
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨  b^{55, 13}_2
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨  b^{55, 13}_1
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨  p_660 ∨ -b^{55, 13}_0
c  in DIMACS:
-17231  17232 -17233  660  17234 0
-17231  17232 -17233  660  17235 0
-17231  17232 -17233  660 -17236 0

c  -2-1 --> break 
c    ( b^{55, 12}_2 ∧  b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨  b^{55, 12}_0 ∨  p_660 ∨ break
c  in DIMACS:
-17231 -17232  17233  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 12}_2 ∧ -b^{55, 12}_1 ∧ -b^{55, 12}_0 ∧ true) 
c  in CNF:
c    -b^{55, 12}_2 ∨  b^{55, 12}_1 ∨  b^{55, 12}_0 ∨ false 
c  in DIMACS:
-17231  17232  17233  0

c  3 does not represent an automaton state.
c    -(-b^{55, 12}_2 ∧  b^{55, 12}_1 ∧  b^{55, 12}_0 ∧ true) 
c  in CNF:
c     b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ false 
c  in DIMACS:
 17231 -17232 -17233  0
c  -3 does not represent an automaton state.
c    -( b^{55, 12}_2 ∧  b^{55, 12}_1 ∧  b^{55, 12}_0 ∧ true) 
c  in CNF:
c    -b^{55, 12}_2 ∨ -b^{55, 12}_1 ∨ -b^{55, 12}_0 ∨ false 
c  in DIMACS:
-17231 -17232 -17233  0

c i = 13
c  -2+1 --> -1
c    ( b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧  p_715) -> ( b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0)
c  in CNF:
c    -b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨  b^{55, 14}_2
c    -b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_1
c    -b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨  b^{55, 14}_0
c  in DIMACS:
-17234 -17235  17236 -715  17237 0
-17234 -17235  17236 -715 -17238 0
-17234 -17235  17236 -715  17239 0

c  -1+1 --> 0
c    ( b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0 ∧  p_715) -> (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧ -b^{55, 14}_0)
c  in CNF:
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_2
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_1
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_0
c  in DIMACS:
-17234  17235 -17236 -715 -17237 0
-17234  17235 -17236 -715 -17238 0
-17234  17235 -17236 -715 -17239 0

c  0+1 --> 1
c    (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧  p_715) -> (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0)
c  in CNF:
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_2
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_1
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨  b^{55, 14}_0
c  in DIMACS:
 17234  17235  17236 -715 -17237 0
 17234  17235  17236 -715 -17238 0
 17234  17235  17236 -715  17239 0

c  1+1 --> 2
c    (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0 ∧  p_715) -> (-b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0)
c  in CNF:
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_2
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨  b^{55, 14}_1
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ -p_715 ∨ -b^{55, 14}_0
c  in DIMACS:
 17234  17235 -17236 -715 -17237 0
 17234  17235 -17236 -715  17238 0
 17234  17235 -17236 -715 -17239 0

c  2+1 --> break 
c    (-b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧  p_715) -> break
c  in CNF:
c     b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 17234 -17235  17236 -715 1162 0


c  2-1 --> 1
c    (-b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧ -p_715) -> (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0)
c  in CNF:
c     b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_2
c     b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_1
c     b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨  b^{55, 14}_0
c  in DIMACS:
 17234 -17235  17236  715 -17237 0
 17234 -17235  17236  715 -17238 0
 17234 -17235  17236  715  17239 0

c  1-1 --> 0
c    (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0 ∧ -p_715) -> (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧ -b^{55, 14}_0)
c  in CNF:
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_2
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_1
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_0
c  in DIMACS:
 17234  17235 -17236  715 -17237 0
 17234  17235 -17236  715 -17238 0
 17234  17235 -17236  715 -17239 0

c  0-1 --> -1
c    (-b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧ -p_715) -> ( b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0)
c  in CNF:
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨  b^{55, 14}_2
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_1
c     b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨  b^{55, 14}_0
c  in DIMACS:
 17234  17235  17236  715  17237 0
 17234  17235  17236  715 -17238 0
 17234  17235  17236  715  17239 0

c  -1-1 --> -2
c    ( b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧  b^{55, 13}_0 ∧ -p_715) -> ( b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0)
c  in CNF:
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨  b^{55, 14}_2
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨  b^{55, 14}_1
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨  p_715 ∨ -b^{55, 14}_0
c  in DIMACS:
-17234  17235 -17236  715  17237 0
-17234  17235 -17236  715  17238 0
-17234  17235 -17236  715 -17239 0

c  -2-1 --> break 
c    ( b^{55, 13}_2 ∧  b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨  b^{55, 13}_0 ∨  p_715 ∨ break
c  in DIMACS:
-17234 -17235  17236  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 13}_2 ∧ -b^{55, 13}_1 ∧ -b^{55, 13}_0 ∧ true) 
c  in CNF:
c    -b^{55, 13}_2 ∨  b^{55, 13}_1 ∨  b^{55, 13}_0 ∨ false 
c  in DIMACS:
-17234  17235  17236  0

c  3 does not represent an automaton state.
c    -(-b^{55, 13}_2 ∧  b^{55, 13}_1 ∧  b^{55, 13}_0 ∧ true) 
c  in CNF:
c     b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ false 
c  in DIMACS:
 17234 -17235 -17236  0
c  -3 does not represent an automaton state.
c    -( b^{55, 13}_2 ∧  b^{55, 13}_1 ∧  b^{55, 13}_0 ∧ true) 
c  in CNF:
c    -b^{55, 13}_2 ∨ -b^{55, 13}_1 ∨ -b^{55, 13}_0 ∨ false 
c  in DIMACS:
-17234 -17235 -17236  0

c i = 14
c  -2+1 --> -1
c    ( b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧  p_770) -> ( b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0)
c  in CNF:
c    -b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨  b^{55, 15}_2
c    -b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_1
c    -b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨  b^{55, 15}_0
c  in DIMACS:
-17237 -17238  17239 -770  17240 0
-17237 -17238  17239 -770 -17241 0
-17237 -17238  17239 -770  17242 0

c  -1+1 --> 0
c    ( b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0 ∧  p_770) -> (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧ -b^{55, 15}_0)
c  in CNF:
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_2
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_1
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_0
c  in DIMACS:
-17237  17238 -17239 -770 -17240 0
-17237  17238 -17239 -770 -17241 0
-17237  17238 -17239 -770 -17242 0

c  0+1 --> 1
c    (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧  p_770) -> (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0)
c  in CNF:
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_2
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_1
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨  b^{55, 15}_0
c  in DIMACS:
 17237  17238  17239 -770 -17240 0
 17237  17238  17239 -770 -17241 0
 17237  17238  17239 -770  17242 0

c  1+1 --> 2
c    (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0 ∧  p_770) -> (-b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0)
c  in CNF:
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_2
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨  b^{55, 15}_1
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ -p_770 ∨ -b^{55, 15}_0
c  in DIMACS:
 17237  17238 -17239 -770 -17240 0
 17237  17238 -17239 -770  17241 0
 17237  17238 -17239 -770 -17242 0

c  2+1 --> break 
c    (-b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧  p_770) -> break
c  in CNF:
c     b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 17237 -17238  17239 -770 1162 0


c  2-1 --> 1
c    (-b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧ -p_770) -> (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0)
c  in CNF:
c     b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_2
c     b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_1
c     b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨  b^{55, 15}_0
c  in DIMACS:
 17237 -17238  17239  770 -17240 0
 17237 -17238  17239  770 -17241 0
 17237 -17238  17239  770  17242 0

c  1-1 --> 0
c    (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0 ∧ -p_770) -> (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧ -b^{55, 15}_0)
c  in CNF:
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_2
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_1
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_0
c  in DIMACS:
 17237  17238 -17239  770 -17240 0
 17237  17238 -17239  770 -17241 0
 17237  17238 -17239  770 -17242 0

c  0-1 --> -1
c    (-b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧ -p_770) -> ( b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0)
c  in CNF:
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨  b^{55, 15}_2
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_1
c     b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨  b^{55, 15}_0
c  in DIMACS:
 17237  17238  17239  770  17240 0
 17237  17238  17239  770 -17241 0
 17237  17238  17239  770  17242 0

c  -1-1 --> -2
c    ( b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧  b^{55, 14}_0 ∧ -p_770) -> ( b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0)
c  in CNF:
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨  b^{55, 15}_2
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨  b^{55, 15}_1
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨  p_770 ∨ -b^{55, 15}_0
c  in DIMACS:
-17237  17238 -17239  770  17240 0
-17237  17238 -17239  770  17241 0
-17237  17238 -17239  770 -17242 0

c  -2-1 --> break 
c    ( b^{55, 14}_2 ∧  b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨  b^{55, 14}_0 ∨  p_770 ∨ break
c  in DIMACS:
-17237 -17238  17239  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 14}_2 ∧ -b^{55, 14}_1 ∧ -b^{55, 14}_0 ∧ true) 
c  in CNF:
c    -b^{55, 14}_2 ∨  b^{55, 14}_1 ∨  b^{55, 14}_0 ∨ false 
c  in DIMACS:
-17237  17238  17239  0

c  3 does not represent an automaton state.
c    -(-b^{55, 14}_2 ∧  b^{55, 14}_1 ∧  b^{55, 14}_0 ∧ true) 
c  in CNF:
c     b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ false 
c  in DIMACS:
 17237 -17238 -17239  0
c  -3 does not represent an automaton state.
c    -( b^{55, 14}_2 ∧  b^{55, 14}_1 ∧  b^{55, 14}_0 ∧ true) 
c  in CNF:
c    -b^{55, 14}_2 ∨ -b^{55, 14}_1 ∨ -b^{55, 14}_0 ∨ false 
c  in DIMACS:
-17237 -17238 -17239  0

c i = 15
c  -2+1 --> -1
c    ( b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧  p_825) -> ( b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0)
c  in CNF:
c    -b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨  b^{55, 16}_2
c    -b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_1
c    -b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨  b^{55, 16}_0
c  in DIMACS:
-17240 -17241  17242 -825  17243 0
-17240 -17241  17242 -825 -17244 0
-17240 -17241  17242 -825  17245 0

c  -1+1 --> 0
c    ( b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0 ∧  p_825) -> (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧ -b^{55, 16}_0)
c  in CNF:
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_2
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_1
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_0
c  in DIMACS:
-17240  17241 -17242 -825 -17243 0
-17240  17241 -17242 -825 -17244 0
-17240  17241 -17242 -825 -17245 0

c  0+1 --> 1
c    (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧  p_825) -> (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0)
c  in CNF:
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_2
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_1
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨  b^{55, 16}_0
c  in DIMACS:
 17240  17241  17242 -825 -17243 0
 17240  17241  17242 -825 -17244 0
 17240  17241  17242 -825  17245 0

c  1+1 --> 2
c    (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0 ∧  p_825) -> (-b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0)
c  in CNF:
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_2
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨  b^{55, 16}_1
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ -p_825 ∨ -b^{55, 16}_0
c  in DIMACS:
 17240  17241 -17242 -825 -17243 0
 17240  17241 -17242 -825  17244 0
 17240  17241 -17242 -825 -17245 0

c  2+1 --> break 
c    (-b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧  p_825) -> break
c  in CNF:
c     b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 17240 -17241  17242 -825 1162 0


c  2-1 --> 1
c    (-b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧ -p_825) -> (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0)
c  in CNF:
c     b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_2
c     b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_1
c     b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨  b^{55, 16}_0
c  in DIMACS:
 17240 -17241  17242  825 -17243 0
 17240 -17241  17242  825 -17244 0
 17240 -17241  17242  825  17245 0

c  1-1 --> 0
c    (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0 ∧ -p_825) -> (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧ -b^{55, 16}_0)
c  in CNF:
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_2
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_1
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_0
c  in DIMACS:
 17240  17241 -17242  825 -17243 0
 17240  17241 -17242  825 -17244 0
 17240  17241 -17242  825 -17245 0

c  0-1 --> -1
c    (-b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧ -p_825) -> ( b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0)
c  in CNF:
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨  b^{55, 16}_2
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_1
c     b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨  b^{55, 16}_0
c  in DIMACS:
 17240  17241  17242  825  17243 0
 17240  17241  17242  825 -17244 0
 17240  17241  17242  825  17245 0

c  -1-1 --> -2
c    ( b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧  b^{55, 15}_0 ∧ -p_825) -> ( b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0)
c  in CNF:
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨  b^{55, 16}_2
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨  b^{55, 16}_1
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨  p_825 ∨ -b^{55, 16}_0
c  in DIMACS:
-17240  17241 -17242  825  17243 0
-17240  17241 -17242  825  17244 0
-17240  17241 -17242  825 -17245 0

c  -2-1 --> break 
c    ( b^{55, 15}_2 ∧  b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨  b^{55, 15}_0 ∨  p_825 ∨ break
c  in DIMACS:
-17240 -17241  17242  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 15}_2 ∧ -b^{55, 15}_1 ∧ -b^{55, 15}_0 ∧ true) 
c  in CNF:
c    -b^{55, 15}_2 ∨  b^{55, 15}_1 ∨  b^{55, 15}_0 ∨ false 
c  in DIMACS:
-17240  17241  17242  0

c  3 does not represent an automaton state.
c    -(-b^{55, 15}_2 ∧  b^{55, 15}_1 ∧  b^{55, 15}_0 ∧ true) 
c  in CNF:
c     b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ false 
c  in DIMACS:
 17240 -17241 -17242  0
c  -3 does not represent an automaton state.
c    -( b^{55, 15}_2 ∧  b^{55, 15}_1 ∧  b^{55, 15}_0 ∧ true) 
c  in CNF:
c    -b^{55, 15}_2 ∨ -b^{55, 15}_1 ∨ -b^{55, 15}_0 ∨ false 
c  in DIMACS:
-17240 -17241 -17242  0

c i = 16
c  -2+1 --> -1
c    ( b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧  p_880) -> ( b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0)
c  in CNF:
c    -b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨  b^{55, 17}_2
c    -b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_1
c    -b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨  b^{55, 17}_0
c  in DIMACS:
-17243 -17244  17245 -880  17246 0
-17243 -17244  17245 -880 -17247 0
-17243 -17244  17245 -880  17248 0

c  -1+1 --> 0
c    ( b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0 ∧  p_880) -> (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧ -b^{55, 17}_0)
c  in CNF:
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_2
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_1
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_0
c  in DIMACS:
-17243  17244 -17245 -880 -17246 0
-17243  17244 -17245 -880 -17247 0
-17243  17244 -17245 -880 -17248 0

c  0+1 --> 1
c    (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧  p_880) -> (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0)
c  in CNF:
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_2
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_1
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨  b^{55, 17}_0
c  in DIMACS:
 17243  17244  17245 -880 -17246 0
 17243  17244  17245 -880 -17247 0
 17243  17244  17245 -880  17248 0

c  1+1 --> 2
c    (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0 ∧  p_880) -> (-b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0)
c  in CNF:
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_2
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨  b^{55, 17}_1
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ -p_880 ∨ -b^{55, 17}_0
c  in DIMACS:
 17243  17244 -17245 -880 -17246 0
 17243  17244 -17245 -880  17247 0
 17243  17244 -17245 -880 -17248 0

c  2+1 --> break 
c    (-b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧  p_880) -> break
c  in CNF:
c     b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 17243 -17244  17245 -880 1162 0


c  2-1 --> 1
c    (-b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧ -p_880) -> (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0)
c  in CNF:
c     b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_2
c     b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_1
c     b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨  b^{55, 17}_0
c  in DIMACS:
 17243 -17244  17245  880 -17246 0
 17243 -17244  17245  880 -17247 0
 17243 -17244  17245  880  17248 0

c  1-1 --> 0
c    (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0 ∧ -p_880) -> (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧ -b^{55, 17}_0)
c  in CNF:
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_2
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_1
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_0
c  in DIMACS:
 17243  17244 -17245  880 -17246 0
 17243  17244 -17245  880 -17247 0
 17243  17244 -17245  880 -17248 0

c  0-1 --> -1
c    (-b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧ -p_880) -> ( b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0)
c  in CNF:
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨  b^{55, 17}_2
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_1
c     b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨  b^{55, 17}_0
c  in DIMACS:
 17243  17244  17245  880  17246 0
 17243  17244  17245  880 -17247 0
 17243  17244  17245  880  17248 0

c  -1-1 --> -2
c    ( b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧  b^{55, 16}_0 ∧ -p_880) -> ( b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0)
c  in CNF:
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨  b^{55, 17}_2
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨  b^{55, 17}_1
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨  p_880 ∨ -b^{55, 17}_0
c  in DIMACS:
-17243  17244 -17245  880  17246 0
-17243  17244 -17245  880  17247 0
-17243  17244 -17245  880 -17248 0

c  -2-1 --> break 
c    ( b^{55, 16}_2 ∧  b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨  b^{55, 16}_0 ∨  p_880 ∨ break
c  in DIMACS:
-17243 -17244  17245  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 16}_2 ∧ -b^{55, 16}_1 ∧ -b^{55, 16}_0 ∧ true) 
c  in CNF:
c    -b^{55, 16}_2 ∨  b^{55, 16}_1 ∨  b^{55, 16}_0 ∨ false 
c  in DIMACS:
-17243  17244  17245  0

c  3 does not represent an automaton state.
c    -(-b^{55, 16}_2 ∧  b^{55, 16}_1 ∧  b^{55, 16}_0 ∧ true) 
c  in CNF:
c     b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ false 
c  in DIMACS:
 17243 -17244 -17245  0
c  -3 does not represent an automaton state.
c    -( b^{55, 16}_2 ∧  b^{55, 16}_1 ∧  b^{55, 16}_0 ∧ true) 
c  in CNF:
c    -b^{55, 16}_2 ∨ -b^{55, 16}_1 ∨ -b^{55, 16}_0 ∨ false 
c  in DIMACS:
-17243 -17244 -17245  0

c i = 17
c  -2+1 --> -1
c    ( b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧  p_935) -> ( b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0)
c  in CNF:
c    -b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨  b^{55, 18}_2
c    -b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_1
c    -b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨  b^{55, 18}_0
c  in DIMACS:
-17246 -17247  17248 -935  17249 0
-17246 -17247  17248 -935 -17250 0
-17246 -17247  17248 -935  17251 0

c  -1+1 --> 0
c    ( b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0 ∧  p_935) -> (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧ -b^{55, 18}_0)
c  in CNF:
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_2
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_1
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_0
c  in DIMACS:
-17246  17247 -17248 -935 -17249 0
-17246  17247 -17248 -935 -17250 0
-17246  17247 -17248 -935 -17251 0

c  0+1 --> 1
c    (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧  p_935) -> (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0)
c  in CNF:
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_2
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_1
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨  b^{55, 18}_0
c  in DIMACS:
 17246  17247  17248 -935 -17249 0
 17246  17247  17248 -935 -17250 0
 17246  17247  17248 -935  17251 0

c  1+1 --> 2
c    (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0 ∧  p_935) -> (-b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0)
c  in CNF:
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_2
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨  b^{55, 18}_1
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ -p_935 ∨ -b^{55, 18}_0
c  in DIMACS:
 17246  17247 -17248 -935 -17249 0
 17246  17247 -17248 -935  17250 0
 17246  17247 -17248 -935 -17251 0

c  2+1 --> break 
c    (-b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧  p_935) -> break
c  in CNF:
c     b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 17246 -17247  17248 -935 1162 0


c  2-1 --> 1
c    (-b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧ -p_935) -> (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0)
c  in CNF:
c     b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_2
c     b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_1
c     b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨  b^{55, 18}_0
c  in DIMACS:
 17246 -17247  17248  935 -17249 0
 17246 -17247  17248  935 -17250 0
 17246 -17247  17248  935  17251 0

c  1-1 --> 0
c    (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0 ∧ -p_935) -> (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧ -b^{55, 18}_0)
c  in CNF:
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_2
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_1
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_0
c  in DIMACS:
 17246  17247 -17248  935 -17249 0
 17246  17247 -17248  935 -17250 0
 17246  17247 -17248  935 -17251 0

c  0-1 --> -1
c    (-b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧ -p_935) -> ( b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0)
c  in CNF:
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨  b^{55, 18}_2
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_1
c     b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨  b^{55, 18}_0
c  in DIMACS:
 17246  17247  17248  935  17249 0
 17246  17247  17248  935 -17250 0
 17246  17247  17248  935  17251 0

c  -1-1 --> -2
c    ( b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧  b^{55, 17}_0 ∧ -p_935) -> ( b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0)
c  in CNF:
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨  b^{55, 18}_2
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨  b^{55, 18}_1
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨  p_935 ∨ -b^{55, 18}_0
c  in DIMACS:
-17246  17247 -17248  935  17249 0
-17246  17247 -17248  935  17250 0
-17246  17247 -17248  935 -17251 0

c  -2-1 --> break 
c    ( b^{55, 17}_2 ∧  b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨  b^{55, 17}_0 ∨  p_935 ∨ break
c  in DIMACS:
-17246 -17247  17248  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 17}_2 ∧ -b^{55, 17}_1 ∧ -b^{55, 17}_0 ∧ true) 
c  in CNF:
c    -b^{55, 17}_2 ∨  b^{55, 17}_1 ∨  b^{55, 17}_0 ∨ false 
c  in DIMACS:
-17246  17247  17248  0

c  3 does not represent an automaton state.
c    -(-b^{55, 17}_2 ∧  b^{55, 17}_1 ∧  b^{55, 17}_0 ∧ true) 
c  in CNF:
c     b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ false 
c  in DIMACS:
 17246 -17247 -17248  0
c  -3 does not represent an automaton state.
c    -( b^{55, 17}_2 ∧  b^{55, 17}_1 ∧  b^{55, 17}_0 ∧ true) 
c  in CNF:
c    -b^{55, 17}_2 ∨ -b^{55, 17}_1 ∨ -b^{55, 17}_0 ∨ false 
c  in DIMACS:
-17246 -17247 -17248  0

c i = 18
c  -2+1 --> -1
c    ( b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧  p_990) -> ( b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0)
c  in CNF:
c    -b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨  b^{55, 19}_2
c    -b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_1
c    -b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨  b^{55, 19}_0
c  in DIMACS:
-17249 -17250  17251 -990  17252 0
-17249 -17250  17251 -990 -17253 0
-17249 -17250  17251 -990  17254 0

c  -1+1 --> 0
c    ( b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0 ∧  p_990) -> (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧ -b^{55, 19}_0)
c  in CNF:
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_2
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_1
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_0
c  in DIMACS:
-17249  17250 -17251 -990 -17252 0
-17249  17250 -17251 -990 -17253 0
-17249  17250 -17251 -990 -17254 0

c  0+1 --> 1
c    (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧  p_990) -> (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0)
c  in CNF:
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_2
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_1
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨  b^{55, 19}_0
c  in DIMACS:
 17249  17250  17251 -990 -17252 0
 17249  17250  17251 -990 -17253 0
 17249  17250  17251 -990  17254 0

c  1+1 --> 2
c    (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0 ∧  p_990) -> (-b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0)
c  in CNF:
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_2
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨  b^{55, 19}_1
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ -p_990 ∨ -b^{55, 19}_0
c  in DIMACS:
 17249  17250 -17251 -990 -17252 0
 17249  17250 -17251 -990  17253 0
 17249  17250 -17251 -990 -17254 0

c  2+1 --> break 
c    (-b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧  p_990) -> break
c  in CNF:
c     b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 17249 -17250  17251 -990 1162 0


c  2-1 --> 1
c    (-b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧ -p_990) -> (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0)
c  in CNF:
c     b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_2
c     b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_1
c     b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨  b^{55, 19}_0
c  in DIMACS:
 17249 -17250  17251  990 -17252 0
 17249 -17250  17251  990 -17253 0
 17249 -17250  17251  990  17254 0

c  1-1 --> 0
c    (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0 ∧ -p_990) -> (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧ -b^{55, 19}_0)
c  in CNF:
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_2
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_1
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_0
c  in DIMACS:
 17249  17250 -17251  990 -17252 0
 17249  17250 -17251  990 -17253 0
 17249  17250 -17251  990 -17254 0

c  0-1 --> -1
c    (-b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧ -p_990) -> ( b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0)
c  in CNF:
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨  b^{55, 19}_2
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_1
c     b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨  b^{55, 19}_0
c  in DIMACS:
 17249  17250  17251  990  17252 0
 17249  17250  17251  990 -17253 0
 17249  17250  17251  990  17254 0

c  -1-1 --> -2
c    ( b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧  b^{55, 18}_0 ∧ -p_990) -> ( b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0)
c  in CNF:
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨  b^{55, 19}_2
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨  b^{55, 19}_1
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨  p_990 ∨ -b^{55, 19}_0
c  in DIMACS:
-17249  17250 -17251  990  17252 0
-17249  17250 -17251  990  17253 0
-17249  17250 -17251  990 -17254 0

c  -2-1 --> break 
c    ( b^{55, 18}_2 ∧  b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨  b^{55, 18}_0 ∨  p_990 ∨ break
c  in DIMACS:
-17249 -17250  17251  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 18}_2 ∧ -b^{55, 18}_1 ∧ -b^{55, 18}_0 ∧ true) 
c  in CNF:
c    -b^{55, 18}_2 ∨  b^{55, 18}_1 ∨  b^{55, 18}_0 ∨ false 
c  in DIMACS:
-17249  17250  17251  0

c  3 does not represent an automaton state.
c    -(-b^{55, 18}_2 ∧  b^{55, 18}_1 ∧  b^{55, 18}_0 ∧ true) 
c  in CNF:
c     b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ false 
c  in DIMACS:
 17249 -17250 -17251  0
c  -3 does not represent an automaton state.
c    -( b^{55, 18}_2 ∧  b^{55, 18}_1 ∧  b^{55, 18}_0 ∧ true) 
c  in CNF:
c    -b^{55, 18}_2 ∨ -b^{55, 18}_1 ∨ -b^{55, 18}_0 ∨ false 
c  in DIMACS:
-17249 -17250 -17251  0

c i = 19
c  -2+1 --> -1
c    ( b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧  p_1045) -> ( b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0)
c  in CNF:
c    -b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨  b^{55, 20}_2
c    -b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_1
c    -b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨  b^{55, 20}_0
c  in DIMACS:
-17252 -17253  17254 -1045  17255 0
-17252 -17253  17254 -1045 -17256 0
-17252 -17253  17254 -1045  17257 0

c  -1+1 --> 0
c    ( b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0 ∧  p_1045) -> (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧ -b^{55, 20}_0)
c  in CNF:
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_2
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_1
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_0
c  in DIMACS:
-17252  17253 -17254 -1045 -17255 0
-17252  17253 -17254 -1045 -17256 0
-17252  17253 -17254 -1045 -17257 0

c  0+1 --> 1
c    (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧  p_1045) -> (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0)
c  in CNF:
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_2
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_1
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨  b^{55, 20}_0
c  in DIMACS:
 17252  17253  17254 -1045 -17255 0
 17252  17253  17254 -1045 -17256 0
 17252  17253  17254 -1045  17257 0

c  1+1 --> 2
c    (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0 ∧  p_1045) -> (-b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0)
c  in CNF:
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_2
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨  b^{55, 20}_1
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ -p_1045 ∨ -b^{55, 20}_0
c  in DIMACS:
 17252  17253 -17254 -1045 -17255 0
 17252  17253 -17254 -1045  17256 0
 17252  17253 -17254 -1045 -17257 0

c  2+1 --> break 
c    (-b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 17252 -17253  17254 -1045 1162 0


c  2-1 --> 1
c    (-b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧ -p_1045) -> (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0)
c  in CNF:
c     b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_2
c     b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_1
c     b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨  b^{55, 20}_0
c  in DIMACS:
 17252 -17253  17254  1045 -17255 0
 17252 -17253  17254  1045 -17256 0
 17252 -17253  17254  1045  17257 0

c  1-1 --> 0
c    (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0 ∧ -p_1045) -> (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧ -b^{55, 20}_0)
c  in CNF:
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_2
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_1
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_0
c  in DIMACS:
 17252  17253 -17254  1045 -17255 0
 17252  17253 -17254  1045 -17256 0
 17252  17253 -17254  1045 -17257 0

c  0-1 --> -1
c    (-b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧ -p_1045) -> ( b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0)
c  in CNF:
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨  b^{55, 20}_2
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_1
c     b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨  b^{55, 20}_0
c  in DIMACS:
 17252  17253  17254  1045  17255 0
 17252  17253  17254  1045 -17256 0
 17252  17253  17254  1045  17257 0

c  -1-1 --> -2
c    ( b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧  b^{55, 19}_0 ∧ -p_1045) -> ( b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0)
c  in CNF:
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨  b^{55, 20}_2
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨  b^{55, 20}_1
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨  p_1045 ∨ -b^{55, 20}_0
c  in DIMACS:
-17252  17253 -17254  1045  17255 0
-17252  17253 -17254  1045  17256 0
-17252  17253 -17254  1045 -17257 0

c  -2-1 --> break 
c    ( b^{55, 19}_2 ∧  b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨  b^{55, 19}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-17252 -17253  17254  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 19}_2 ∧ -b^{55, 19}_1 ∧ -b^{55, 19}_0 ∧ true) 
c  in CNF:
c    -b^{55, 19}_2 ∨  b^{55, 19}_1 ∨  b^{55, 19}_0 ∨ false 
c  in DIMACS:
-17252  17253  17254  0

c  3 does not represent an automaton state.
c    -(-b^{55, 19}_2 ∧  b^{55, 19}_1 ∧  b^{55, 19}_0 ∧ true) 
c  in CNF:
c     b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ false 
c  in DIMACS:
 17252 -17253 -17254  0
c  -3 does not represent an automaton state.
c    -( b^{55, 19}_2 ∧  b^{55, 19}_1 ∧  b^{55, 19}_0 ∧ true) 
c  in CNF:
c    -b^{55, 19}_2 ∨ -b^{55, 19}_1 ∨ -b^{55, 19}_0 ∨ false 
c  in DIMACS:
-17252 -17253 -17254  0

c i = 20
c  -2+1 --> -1
c    ( b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧  p_1100) -> ( b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0)
c  in CNF:
c    -b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨  b^{55, 21}_2
c    -b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_1
c    -b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨  b^{55, 21}_0
c  in DIMACS:
-17255 -17256  17257 -1100  17258 0
-17255 -17256  17257 -1100 -17259 0
-17255 -17256  17257 -1100  17260 0

c  -1+1 --> 0
c    ( b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0 ∧  p_1100) -> (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧ -b^{55, 21}_0)
c  in CNF:
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_2
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_1
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_0
c  in DIMACS:
-17255  17256 -17257 -1100 -17258 0
-17255  17256 -17257 -1100 -17259 0
-17255  17256 -17257 -1100 -17260 0

c  0+1 --> 1
c    (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧  p_1100) -> (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0)
c  in CNF:
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_2
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_1
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨  b^{55, 21}_0
c  in DIMACS:
 17255  17256  17257 -1100 -17258 0
 17255  17256  17257 -1100 -17259 0
 17255  17256  17257 -1100  17260 0

c  1+1 --> 2
c    (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0 ∧  p_1100) -> (-b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0)
c  in CNF:
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_2
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨  b^{55, 21}_1
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ -p_1100 ∨ -b^{55, 21}_0
c  in DIMACS:
 17255  17256 -17257 -1100 -17258 0
 17255  17256 -17257 -1100  17259 0
 17255  17256 -17257 -1100 -17260 0

c  2+1 --> break 
c    (-b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 17255 -17256  17257 -1100 1162 0


c  2-1 --> 1
c    (-b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧ -p_1100) -> (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0)
c  in CNF:
c     b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_2
c     b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_1
c     b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨  b^{55, 21}_0
c  in DIMACS:
 17255 -17256  17257  1100 -17258 0
 17255 -17256  17257  1100 -17259 0
 17255 -17256  17257  1100  17260 0

c  1-1 --> 0
c    (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0 ∧ -p_1100) -> (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧ -b^{55, 21}_0)
c  in CNF:
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_2
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_1
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_0
c  in DIMACS:
 17255  17256 -17257  1100 -17258 0
 17255  17256 -17257  1100 -17259 0
 17255  17256 -17257  1100 -17260 0

c  0-1 --> -1
c    (-b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧ -p_1100) -> ( b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0)
c  in CNF:
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨  b^{55, 21}_2
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_1
c     b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨  b^{55, 21}_0
c  in DIMACS:
 17255  17256  17257  1100  17258 0
 17255  17256  17257  1100 -17259 0
 17255  17256  17257  1100  17260 0

c  -1-1 --> -2
c    ( b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧  b^{55, 20}_0 ∧ -p_1100) -> ( b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0)
c  in CNF:
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨  b^{55, 21}_2
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨  b^{55, 21}_1
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨  p_1100 ∨ -b^{55, 21}_0
c  in DIMACS:
-17255  17256 -17257  1100  17258 0
-17255  17256 -17257  1100  17259 0
-17255  17256 -17257  1100 -17260 0

c  -2-1 --> break 
c    ( b^{55, 20}_2 ∧  b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨  b^{55, 20}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-17255 -17256  17257  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 20}_2 ∧ -b^{55, 20}_1 ∧ -b^{55, 20}_0 ∧ true) 
c  in CNF:
c    -b^{55, 20}_2 ∨  b^{55, 20}_1 ∨  b^{55, 20}_0 ∨ false 
c  in DIMACS:
-17255  17256  17257  0

c  3 does not represent an automaton state.
c    -(-b^{55, 20}_2 ∧  b^{55, 20}_1 ∧  b^{55, 20}_0 ∧ true) 
c  in CNF:
c     b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ false 
c  in DIMACS:
 17255 -17256 -17257  0
c  -3 does not represent an automaton state.
c    -( b^{55, 20}_2 ∧  b^{55, 20}_1 ∧  b^{55, 20}_0 ∧ true) 
c  in CNF:
c    -b^{55, 20}_2 ∨ -b^{55, 20}_1 ∨ -b^{55, 20}_0 ∨ false 
c  in DIMACS:
-17255 -17256 -17257  0

c i = 21
c  -2+1 --> -1
c    ( b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧  p_1155) -> ( b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧  b^{55, 22}_0)
c  in CNF:
c    -b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨  b^{55, 22}_2
c    -b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_1
c    -b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨  b^{55, 22}_0
c  in DIMACS:
-17258 -17259  17260 -1155  17261 0
-17258 -17259  17260 -1155 -17262 0
-17258 -17259  17260 -1155  17263 0

c  -1+1 --> 0
c    ( b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0 ∧  p_1155) -> (-b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧ -b^{55, 22}_0)
c  in CNF:
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_2
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_1
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_0
c  in DIMACS:
-17258  17259 -17260 -1155 -17261 0
-17258  17259 -17260 -1155 -17262 0
-17258  17259 -17260 -1155 -17263 0

c  0+1 --> 1
c    (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧  p_1155) -> (-b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧  b^{55, 22}_0)
c  in CNF:
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_2
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_1
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨  b^{55, 22}_0
c  in DIMACS:
 17258  17259  17260 -1155 -17261 0
 17258  17259  17260 -1155 -17262 0
 17258  17259  17260 -1155  17263 0

c  1+1 --> 2
c    (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0 ∧  p_1155) -> (-b^{55, 22}_2 ∧  b^{55, 22}_1 ∧ -b^{55, 22}_0)
c  in CNF:
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_2
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨  b^{55, 22}_1
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ -p_1155 ∨ -b^{55, 22}_0
c  in DIMACS:
 17258  17259 -17260 -1155 -17261 0
 17258  17259 -17260 -1155  17262 0
 17258  17259 -17260 -1155 -17263 0

c  2+1 --> break 
c    (-b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 17258 -17259  17260 -1155 1162 0


c  2-1 --> 1
c    (-b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧ -p_1155) -> (-b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧  b^{55, 22}_0)
c  in CNF:
c     b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_2
c     b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_1
c     b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨  b^{55, 22}_0
c  in DIMACS:
 17258 -17259  17260  1155 -17261 0
 17258 -17259  17260  1155 -17262 0
 17258 -17259  17260  1155  17263 0

c  1-1 --> 0
c    (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0 ∧ -p_1155) -> (-b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧ -b^{55, 22}_0)
c  in CNF:
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_2
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_1
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_0
c  in DIMACS:
 17258  17259 -17260  1155 -17261 0
 17258  17259 -17260  1155 -17262 0
 17258  17259 -17260  1155 -17263 0

c  0-1 --> -1
c    (-b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧ -p_1155) -> ( b^{55, 22}_2 ∧ -b^{55, 22}_1 ∧  b^{55, 22}_0)
c  in CNF:
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨  b^{55, 22}_2
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_1
c     b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨  b^{55, 22}_0
c  in DIMACS:
 17258  17259  17260  1155  17261 0
 17258  17259  17260  1155 -17262 0
 17258  17259  17260  1155  17263 0

c  -1-1 --> -2
c    ( b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧  b^{55, 21}_0 ∧ -p_1155) -> ( b^{55, 22}_2 ∧  b^{55, 22}_1 ∧ -b^{55, 22}_0)
c  in CNF:
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨  b^{55, 22}_2
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨  b^{55, 22}_1
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨  p_1155 ∨ -b^{55, 22}_0
c  in DIMACS:
-17258  17259 -17260  1155  17261 0
-17258  17259 -17260  1155  17262 0
-17258  17259 -17260  1155 -17263 0

c  -2-1 --> break 
c    ( b^{55, 21}_2 ∧  b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨  b^{55, 21}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-17258 -17259  17260  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{55, 21}_2 ∧ -b^{55, 21}_1 ∧ -b^{55, 21}_0 ∧ true) 
c  in CNF:
c    -b^{55, 21}_2 ∨  b^{55, 21}_1 ∨  b^{55, 21}_0 ∨ false 
c  in DIMACS:
-17258  17259  17260  0

c  3 does not represent an automaton state.
c    -(-b^{55, 21}_2 ∧  b^{55, 21}_1 ∧  b^{55, 21}_0 ∧ true) 
c  in CNF:
c     b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ false 
c  in DIMACS:
 17258 -17259 -17260  0
c  -3 does not represent an automaton state.
c    -( b^{55, 21}_2 ∧  b^{55, 21}_1 ∧  b^{55, 21}_0 ∧ true) 
c  in CNF:
c    -b^{55, 21}_2 ∨ -b^{55, 21}_1 ∨ -b^{55, 21}_0 ∨ false 
c  in DIMACS:
-17258 -17259 -17260  0

c INIT for k = 56
c    -b^{56, 1}_2
c    -b^{56, 1}_1
c    -b^{56, 1}_0
c  in DIMACS:
-17264 0
-17265 0
-17266 0

c Transitions for k = 56
c i = 1
c  -2+1 --> -1
c    ( b^{56, 1}_2 ∧  b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧  p_56) -> ( b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0)
c  in CNF:
c    -b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨  b^{56, 2}_2
c    -b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_1
c    -b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨  b^{56, 2}_0
c  in DIMACS:
-17264 -17265  17266 -56  17267 0
-17264 -17265  17266 -56 -17268 0
-17264 -17265  17266 -56  17269 0

c  -1+1 --> 0
c    ( b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧  b^{56, 1}_0 ∧  p_56) -> (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧ -b^{56, 2}_0)
c  in CNF:
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_2
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_1
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_0
c  in DIMACS:
-17264  17265 -17266 -56 -17267 0
-17264  17265 -17266 -56 -17268 0
-17264  17265 -17266 -56 -17269 0

c  0+1 --> 1
c    (-b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧  p_56) -> (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0)
c  in CNF:
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_2
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_1
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨  b^{56, 2}_0
c  in DIMACS:
 17264  17265  17266 -56 -17267 0
 17264  17265  17266 -56 -17268 0
 17264  17265  17266 -56  17269 0

c  1+1 --> 2
c    (-b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧  b^{56, 1}_0 ∧  p_56) -> (-b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0)
c  in CNF:
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_2
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨  b^{56, 2}_1
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ -p_56 ∨ -b^{56, 2}_0
c  in DIMACS:
 17264  17265 -17266 -56 -17267 0
 17264  17265 -17266 -56  17268 0
 17264  17265 -17266 -56 -17269 0

c  2+1 --> break 
c    (-b^{56, 1}_2 ∧  b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧  p_56) -> break
c  in CNF:
c     b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ -p_56 ∨ break
c  in DIMACS:
 17264 -17265  17266 -56 1162 0


c  2-1 --> 1
c    (-b^{56, 1}_2 ∧  b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧ -p_56) -> (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0)
c  in CNF:
c     b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_2
c     b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_1
c     b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨  b^{56, 2}_0
c  in DIMACS:
 17264 -17265  17266  56 -17267 0
 17264 -17265  17266  56 -17268 0
 17264 -17265  17266  56  17269 0

c  1-1 --> 0
c    (-b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧  b^{56, 1}_0 ∧ -p_56) -> (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧ -b^{56, 2}_0)
c  in CNF:
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_2
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_1
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_0
c  in DIMACS:
 17264  17265 -17266  56 -17267 0
 17264  17265 -17266  56 -17268 0
 17264  17265 -17266  56 -17269 0

c  0-1 --> -1
c    (-b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧ -p_56) -> ( b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0)
c  in CNF:
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨  b^{56, 2}_2
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_1
c     b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨  b^{56, 2}_0
c  in DIMACS:
 17264  17265  17266  56  17267 0
 17264  17265  17266  56 -17268 0
 17264  17265  17266  56  17269 0

c  -1-1 --> -2
c    ( b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧  b^{56, 1}_0 ∧ -p_56) -> ( b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0)
c  in CNF:
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨  b^{56, 2}_2
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨  b^{56, 2}_1
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨  p_56 ∨ -b^{56, 2}_0
c  in DIMACS:
-17264  17265 -17266  56  17267 0
-17264  17265 -17266  56  17268 0
-17264  17265 -17266  56 -17269 0

c  -2-1 --> break 
c    ( b^{56, 1}_2 ∧  b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧ -p_56) -> break
c  in CNF:
c    -b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨  b^{56, 1}_0 ∨  p_56 ∨ break
c  in DIMACS:
-17264 -17265  17266  56 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 1}_2 ∧ -b^{56, 1}_1 ∧ -b^{56, 1}_0 ∧ true) 
c  in CNF:
c    -b^{56, 1}_2 ∨  b^{56, 1}_1 ∨  b^{56, 1}_0 ∨ false 
c  in DIMACS:
-17264  17265  17266  0

c  3 does not represent an automaton state.
c    -(-b^{56, 1}_2 ∧  b^{56, 1}_1 ∧  b^{56, 1}_0 ∧ true) 
c  in CNF:
c     b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ false 
c  in DIMACS:
 17264 -17265 -17266  0
c  -3 does not represent an automaton state.
c    -( b^{56, 1}_2 ∧  b^{56, 1}_1 ∧  b^{56, 1}_0 ∧ true) 
c  in CNF:
c    -b^{56, 1}_2 ∨ -b^{56, 1}_1 ∨ -b^{56, 1}_0 ∨ false 
c  in DIMACS:
-17264 -17265 -17266  0

c i = 2
c  -2+1 --> -1
c    ( b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧  p_112) -> ( b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0)
c  in CNF:
c    -b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨  b^{56, 3}_2
c    -b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_1
c    -b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨  b^{56, 3}_0
c  in DIMACS:
-17267 -17268  17269 -112  17270 0
-17267 -17268  17269 -112 -17271 0
-17267 -17268  17269 -112  17272 0

c  -1+1 --> 0
c    ( b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0 ∧  p_112) -> (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧ -b^{56, 3}_0)
c  in CNF:
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_2
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_1
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_0
c  in DIMACS:
-17267  17268 -17269 -112 -17270 0
-17267  17268 -17269 -112 -17271 0
-17267  17268 -17269 -112 -17272 0

c  0+1 --> 1
c    (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧  p_112) -> (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0)
c  in CNF:
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_2
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_1
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨  b^{56, 3}_0
c  in DIMACS:
 17267  17268  17269 -112 -17270 0
 17267  17268  17269 -112 -17271 0
 17267  17268  17269 -112  17272 0

c  1+1 --> 2
c    (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0 ∧  p_112) -> (-b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0)
c  in CNF:
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_2
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨  b^{56, 3}_1
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ -p_112 ∨ -b^{56, 3}_0
c  in DIMACS:
 17267  17268 -17269 -112 -17270 0
 17267  17268 -17269 -112  17271 0
 17267  17268 -17269 -112 -17272 0

c  2+1 --> break 
c    (-b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧  p_112) -> break
c  in CNF:
c     b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 17267 -17268  17269 -112 1162 0


c  2-1 --> 1
c    (-b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧ -p_112) -> (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0)
c  in CNF:
c     b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_2
c     b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_1
c     b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨  b^{56, 3}_0
c  in DIMACS:
 17267 -17268  17269  112 -17270 0
 17267 -17268  17269  112 -17271 0
 17267 -17268  17269  112  17272 0

c  1-1 --> 0
c    (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0 ∧ -p_112) -> (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧ -b^{56, 3}_0)
c  in CNF:
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_2
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_1
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_0
c  in DIMACS:
 17267  17268 -17269  112 -17270 0
 17267  17268 -17269  112 -17271 0
 17267  17268 -17269  112 -17272 0

c  0-1 --> -1
c    (-b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧ -p_112) -> ( b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0)
c  in CNF:
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨  b^{56, 3}_2
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_1
c     b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨  b^{56, 3}_0
c  in DIMACS:
 17267  17268  17269  112  17270 0
 17267  17268  17269  112 -17271 0
 17267  17268  17269  112  17272 0

c  -1-1 --> -2
c    ( b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧  b^{56, 2}_0 ∧ -p_112) -> ( b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0)
c  in CNF:
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨  b^{56, 3}_2
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨  b^{56, 3}_1
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨  p_112 ∨ -b^{56, 3}_0
c  in DIMACS:
-17267  17268 -17269  112  17270 0
-17267  17268 -17269  112  17271 0
-17267  17268 -17269  112 -17272 0

c  -2-1 --> break 
c    ( b^{56, 2}_2 ∧  b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨  b^{56, 2}_0 ∨  p_112 ∨ break
c  in DIMACS:
-17267 -17268  17269  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 2}_2 ∧ -b^{56, 2}_1 ∧ -b^{56, 2}_0 ∧ true) 
c  in CNF:
c    -b^{56, 2}_2 ∨  b^{56, 2}_1 ∨  b^{56, 2}_0 ∨ false 
c  in DIMACS:
-17267  17268  17269  0

c  3 does not represent an automaton state.
c    -(-b^{56, 2}_2 ∧  b^{56, 2}_1 ∧  b^{56, 2}_0 ∧ true) 
c  in CNF:
c     b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ false 
c  in DIMACS:
 17267 -17268 -17269  0
c  -3 does not represent an automaton state.
c    -( b^{56, 2}_2 ∧  b^{56, 2}_1 ∧  b^{56, 2}_0 ∧ true) 
c  in CNF:
c    -b^{56, 2}_2 ∨ -b^{56, 2}_1 ∨ -b^{56, 2}_0 ∨ false 
c  in DIMACS:
-17267 -17268 -17269  0

c i = 3
c  -2+1 --> -1
c    ( b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧  p_168) -> ( b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0)
c  in CNF:
c    -b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨  b^{56, 4}_2
c    -b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_1
c    -b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨  b^{56, 4}_0
c  in DIMACS:
-17270 -17271  17272 -168  17273 0
-17270 -17271  17272 -168 -17274 0
-17270 -17271  17272 -168  17275 0

c  -1+1 --> 0
c    ( b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0 ∧  p_168) -> (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧ -b^{56, 4}_0)
c  in CNF:
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_2
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_1
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_0
c  in DIMACS:
-17270  17271 -17272 -168 -17273 0
-17270  17271 -17272 -168 -17274 0
-17270  17271 -17272 -168 -17275 0

c  0+1 --> 1
c    (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧  p_168) -> (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0)
c  in CNF:
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_2
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_1
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨  b^{56, 4}_0
c  in DIMACS:
 17270  17271  17272 -168 -17273 0
 17270  17271  17272 -168 -17274 0
 17270  17271  17272 -168  17275 0

c  1+1 --> 2
c    (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0 ∧  p_168) -> (-b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0)
c  in CNF:
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_2
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨  b^{56, 4}_1
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ -p_168 ∨ -b^{56, 4}_0
c  in DIMACS:
 17270  17271 -17272 -168 -17273 0
 17270  17271 -17272 -168  17274 0
 17270  17271 -17272 -168 -17275 0

c  2+1 --> break 
c    (-b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧  p_168) -> break
c  in CNF:
c     b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 17270 -17271  17272 -168 1162 0


c  2-1 --> 1
c    (-b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧ -p_168) -> (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0)
c  in CNF:
c     b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_2
c     b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_1
c     b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨  b^{56, 4}_0
c  in DIMACS:
 17270 -17271  17272  168 -17273 0
 17270 -17271  17272  168 -17274 0
 17270 -17271  17272  168  17275 0

c  1-1 --> 0
c    (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0 ∧ -p_168) -> (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧ -b^{56, 4}_0)
c  in CNF:
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_2
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_1
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_0
c  in DIMACS:
 17270  17271 -17272  168 -17273 0
 17270  17271 -17272  168 -17274 0
 17270  17271 -17272  168 -17275 0

c  0-1 --> -1
c    (-b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧ -p_168) -> ( b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0)
c  in CNF:
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨  b^{56, 4}_2
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_1
c     b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨  b^{56, 4}_0
c  in DIMACS:
 17270  17271  17272  168  17273 0
 17270  17271  17272  168 -17274 0
 17270  17271  17272  168  17275 0

c  -1-1 --> -2
c    ( b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧  b^{56, 3}_0 ∧ -p_168) -> ( b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0)
c  in CNF:
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨  b^{56, 4}_2
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨  b^{56, 4}_1
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨  p_168 ∨ -b^{56, 4}_0
c  in DIMACS:
-17270  17271 -17272  168  17273 0
-17270  17271 -17272  168  17274 0
-17270  17271 -17272  168 -17275 0

c  -2-1 --> break 
c    ( b^{56, 3}_2 ∧  b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨  b^{56, 3}_0 ∨  p_168 ∨ break
c  in DIMACS:
-17270 -17271  17272  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 3}_2 ∧ -b^{56, 3}_1 ∧ -b^{56, 3}_0 ∧ true) 
c  in CNF:
c    -b^{56, 3}_2 ∨  b^{56, 3}_1 ∨  b^{56, 3}_0 ∨ false 
c  in DIMACS:
-17270  17271  17272  0

c  3 does not represent an automaton state.
c    -(-b^{56, 3}_2 ∧  b^{56, 3}_1 ∧  b^{56, 3}_0 ∧ true) 
c  in CNF:
c     b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ false 
c  in DIMACS:
 17270 -17271 -17272  0
c  -3 does not represent an automaton state.
c    -( b^{56, 3}_2 ∧  b^{56, 3}_1 ∧  b^{56, 3}_0 ∧ true) 
c  in CNF:
c    -b^{56, 3}_2 ∨ -b^{56, 3}_1 ∨ -b^{56, 3}_0 ∨ false 
c  in DIMACS:
-17270 -17271 -17272  0

c i = 4
c  -2+1 --> -1
c    ( b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧  p_224) -> ( b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0)
c  in CNF:
c    -b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨  b^{56, 5}_2
c    -b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_1
c    -b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨  b^{56, 5}_0
c  in DIMACS:
-17273 -17274  17275 -224  17276 0
-17273 -17274  17275 -224 -17277 0
-17273 -17274  17275 -224  17278 0

c  -1+1 --> 0
c    ( b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0 ∧  p_224) -> (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧ -b^{56, 5}_0)
c  in CNF:
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_2
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_1
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_0
c  in DIMACS:
-17273  17274 -17275 -224 -17276 0
-17273  17274 -17275 -224 -17277 0
-17273  17274 -17275 -224 -17278 0

c  0+1 --> 1
c    (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧  p_224) -> (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0)
c  in CNF:
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_2
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_1
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨  b^{56, 5}_0
c  in DIMACS:
 17273  17274  17275 -224 -17276 0
 17273  17274  17275 -224 -17277 0
 17273  17274  17275 -224  17278 0

c  1+1 --> 2
c    (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0 ∧  p_224) -> (-b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0)
c  in CNF:
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_2
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨  b^{56, 5}_1
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ -p_224 ∨ -b^{56, 5}_0
c  in DIMACS:
 17273  17274 -17275 -224 -17276 0
 17273  17274 -17275 -224  17277 0
 17273  17274 -17275 -224 -17278 0

c  2+1 --> break 
c    (-b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧  p_224) -> break
c  in CNF:
c     b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 17273 -17274  17275 -224 1162 0


c  2-1 --> 1
c    (-b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧ -p_224) -> (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0)
c  in CNF:
c     b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_2
c     b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_1
c     b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨  b^{56, 5}_0
c  in DIMACS:
 17273 -17274  17275  224 -17276 0
 17273 -17274  17275  224 -17277 0
 17273 -17274  17275  224  17278 0

c  1-1 --> 0
c    (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0 ∧ -p_224) -> (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧ -b^{56, 5}_0)
c  in CNF:
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_2
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_1
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_0
c  in DIMACS:
 17273  17274 -17275  224 -17276 0
 17273  17274 -17275  224 -17277 0
 17273  17274 -17275  224 -17278 0

c  0-1 --> -1
c    (-b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧ -p_224) -> ( b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0)
c  in CNF:
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨  b^{56, 5}_2
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_1
c     b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨  b^{56, 5}_0
c  in DIMACS:
 17273  17274  17275  224  17276 0
 17273  17274  17275  224 -17277 0
 17273  17274  17275  224  17278 0

c  -1-1 --> -2
c    ( b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧  b^{56, 4}_0 ∧ -p_224) -> ( b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0)
c  in CNF:
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨  b^{56, 5}_2
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨  b^{56, 5}_1
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨  p_224 ∨ -b^{56, 5}_0
c  in DIMACS:
-17273  17274 -17275  224  17276 0
-17273  17274 -17275  224  17277 0
-17273  17274 -17275  224 -17278 0

c  -2-1 --> break 
c    ( b^{56, 4}_2 ∧  b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨  b^{56, 4}_0 ∨  p_224 ∨ break
c  in DIMACS:
-17273 -17274  17275  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 4}_2 ∧ -b^{56, 4}_1 ∧ -b^{56, 4}_0 ∧ true) 
c  in CNF:
c    -b^{56, 4}_2 ∨  b^{56, 4}_1 ∨  b^{56, 4}_0 ∨ false 
c  in DIMACS:
-17273  17274  17275  0

c  3 does not represent an automaton state.
c    -(-b^{56, 4}_2 ∧  b^{56, 4}_1 ∧  b^{56, 4}_0 ∧ true) 
c  in CNF:
c     b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ false 
c  in DIMACS:
 17273 -17274 -17275  0
c  -3 does not represent an automaton state.
c    -( b^{56, 4}_2 ∧  b^{56, 4}_1 ∧  b^{56, 4}_0 ∧ true) 
c  in CNF:
c    -b^{56, 4}_2 ∨ -b^{56, 4}_1 ∨ -b^{56, 4}_0 ∨ false 
c  in DIMACS:
-17273 -17274 -17275  0

c i = 5
c  -2+1 --> -1
c    ( b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧  p_280) -> ( b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0)
c  in CNF:
c    -b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨  b^{56, 6}_2
c    -b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_1
c    -b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨  b^{56, 6}_0
c  in DIMACS:
-17276 -17277  17278 -280  17279 0
-17276 -17277  17278 -280 -17280 0
-17276 -17277  17278 -280  17281 0

c  -1+1 --> 0
c    ( b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0 ∧  p_280) -> (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧ -b^{56, 6}_0)
c  in CNF:
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_2
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_1
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_0
c  in DIMACS:
-17276  17277 -17278 -280 -17279 0
-17276  17277 -17278 -280 -17280 0
-17276  17277 -17278 -280 -17281 0

c  0+1 --> 1
c    (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧  p_280) -> (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0)
c  in CNF:
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_2
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_1
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨  b^{56, 6}_0
c  in DIMACS:
 17276  17277  17278 -280 -17279 0
 17276  17277  17278 -280 -17280 0
 17276  17277  17278 -280  17281 0

c  1+1 --> 2
c    (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0 ∧  p_280) -> (-b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0)
c  in CNF:
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_2
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨  b^{56, 6}_1
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ -p_280 ∨ -b^{56, 6}_0
c  in DIMACS:
 17276  17277 -17278 -280 -17279 0
 17276  17277 -17278 -280  17280 0
 17276  17277 -17278 -280 -17281 0

c  2+1 --> break 
c    (-b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧  p_280) -> break
c  in CNF:
c     b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 17276 -17277  17278 -280 1162 0


c  2-1 --> 1
c    (-b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧ -p_280) -> (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0)
c  in CNF:
c     b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_2
c     b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_1
c     b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨  b^{56, 6}_0
c  in DIMACS:
 17276 -17277  17278  280 -17279 0
 17276 -17277  17278  280 -17280 0
 17276 -17277  17278  280  17281 0

c  1-1 --> 0
c    (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0 ∧ -p_280) -> (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧ -b^{56, 6}_0)
c  in CNF:
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_2
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_1
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_0
c  in DIMACS:
 17276  17277 -17278  280 -17279 0
 17276  17277 -17278  280 -17280 0
 17276  17277 -17278  280 -17281 0

c  0-1 --> -1
c    (-b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧ -p_280) -> ( b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0)
c  in CNF:
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨  b^{56, 6}_2
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_1
c     b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨  b^{56, 6}_0
c  in DIMACS:
 17276  17277  17278  280  17279 0
 17276  17277  17278  280 -17280 0
 17276  17277  17278  280  17281 0

c  -1-1 --> -2
c    ( b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧  b^{56, 5}_0 ∧ -p_280) -> ( b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0)
c  in CNF:
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨  b^{56, 6}_2
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨  b^{56, 6}_1
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨  p_280 ∨ -b^{56, 6}_0
c  in DIMACS:
-17276  17277 -17278  280  17279 0
-17276  17277 -17278  280  17280 0
-17276  17277 -17278  280 -17281 0

c  -2-1 --> break 
c    ( b^{56, 5}_2 ∧  b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨  b^{56, 5}_0 ∨  p_280 ∨ break
c  in DIMACS:
-17276 -17277  17278  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 5}_2 ∧ -b^{56, 5}_1 ∧ -b^{56, 5}_0 ∧ true) 
c  in CNF:
c    -b^{56, 5}_2 ∨  b^{56, 5}_1 ∨  b^{56, 5}_0 ∨ false 
c  in DIMACS:
-17276  17277  17278  0

c  3 does not represent an automaton state.
c    -(-b^{56, 5}_2 ∧  b^{56, 5}_1 ∧  b^{56, 5}_0 ∧ true) 
c  in CNF:
c     b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ false 
c  in DIMACS:
 17276 -17277 -17278  0
c  -3 does not represent an automaton state.
c    -( b^{56, 5}_2 ∧  b^{56, 5}_1 ∧  b^{56, 5}_0 ∧ true) 
c  in CNF:
c    -b^{56, 5}_2 ∨ -b^{56, 5}_1 ∨ -b^{56, 5}_0 ∨ false 
c  in DIMACS:
-17276 -17277 -17278  0

c i = 6
c  -2+1 --> -1
c    ( b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧  p_336) -> ( b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0)
c  in CNF:
c    -b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨  b^{56, 7}_2
c    -b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_1
c    -b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨  b^{56, 7}_0
c  in DIMACS:
-17279 -17280  17281 -336  17282 0
-17279 -17280  17281 -336 -17283 0
-17279 -17280  17281 -336  17284 0

c  -1+1 --> 0
c    ( b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0 ∧  p_336) -> (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧ -b^{56, 7}_0)
c  in CNF:
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_2
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_1
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_0
c  in DIMACS:
-17279  17280 -17281 -336 -17282 0
-17279  17280 -17281 -336 -17283 0
-17279  17280 -17281 -336 -17284 0

c  0+1 --> 1
c    (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧  p_336) -> (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0)
c  in CNF:
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_2
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_1
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨  b^{56, 7}_0
c  in DIMACS:
 17279  17280  17281 -336 -17282 0
 17279  17280  17281 -336 -17283 0
 17279  17280  17281 -336  17284 0

c  1+1 --> 2
c    (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0 ∧  p_336) -> (-b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0)
c  in CNF:
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_2
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨  b^{56, 7}_1
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ -p_336 ∨ -b^{56, 7}_0
c  in DIMACS:
 17279  17280 -17281 -336 -17282 0
 17279  17280 -17281 -336  17283 0
 17279  17280 -17281 -336 -17284 0

c  2+1 --> break 
c    (-b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧  p_336) -> break
c  in CNF:
c     b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 17279 -17280  17281 -336 1162 0


c  2-1 --> 1
c    (-b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧ -p_336) -> (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0)
c  in CNF:
c     b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_2
c     b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_1
c     b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨  b^{56, 7}_0
c  in DIMACS:
 17279 -17280  17281  336 -17282 0
 17279 -17280  17281  336 -17283 0
 17279 -17280  17281  336  17284 0

c  1-1 --> 0
c    (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0 ∧ -p_336) -> (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧ -b^{56, 7}_0)
c  in CNF:
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_2
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_1
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_0
c  in DIMACS:
 17279  17280 -17281  336 -17282 0
 17279  17280 -17281  336 -17283 0
 17279  17280 -17281  336 -17284 0

c  0-1 --> -1
c    (-b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧ -p_336) -> ( b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0)
c  in CNF:
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨  b^{56, 7}_2
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_1
c     b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨  b^{56, 7}_0
c  in DIMACS:
 17279  17280  17281  336  17282 0
 17279  17280  17281  336 -17283 0
 17279  17280  17281  336  17284 0

c  -1-1 --> -2
c    ( b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧  b^{56, 6}_0 ∧ -p_336) -> ( b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0)
c  in CNF:
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨  b^{56, 7}_2
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨  b^{56, 7}_1
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨  p_336 ∨ -b^{56, 7}_0
c  in DIMACS:
-17279  17280 -17281  336  17282 0
-17279  17280 -17281  336  17283 0
-17279  17280 -17281  336 -17284 0

c  -2-1 --> break 
c    ( b^{56, 6}_2 ∧  b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨  b^{56, 6}_0 ∨  p_336 ∨ break
c  in DIMACS:
-17279 -17280  17281  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 6}_2 ∧ -b^{56, 6}_1 ∧ -b^{56, 6}_0 ∧ true) 
c  in CNF:
c    -b^{56, 6}_2 ∨  b^{56, 6}_1 ∨  b^{56, 6}_0 ∨ false 
c  in DIMACS:
-17279  17280  17281  0

c  3 does not represent an automaton state.
c    -(-b^{56, 6}_2 ∧  b^{56, 6}_1 ∧  b^{56, 6}_0 ∧ true) 
c  in CNF:
c     b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ false 
c  in DIMACS:
 17279 -17280 -17281  0
c  -3 does not represent an automaton state.
c    -( b^{56, 6}_2 ∧  b^{56, 6}_1 ∧  b^{56, 6}_0 ∧ true) 
c  in CNF:
c    -b^{56, 6}_2 ∨ -b^{56, 6}_1 ∨ -b^{56, 6}_0 ∨ false 
c  in DIMACS:
-17279 -17280 -17281  0

c i = 7
c  -2+1 --> -1
c    ( b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧  p_392) -> ( b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0)
c  in CNF:
c    -b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨  b^{56, 8}_2
c    -b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_1
c    -b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨  b^{56, 8}_0
c  in DIMACS:
-17282 -17283  17284 -392  17285 0
-17282 -17283  17284 -392 -17286 0
-17282 -17283  17284 -392  17287 0

c  -1+1 --> 0
c    ( b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0 ∧  p_392) -> (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧ -b^{56, 8}_0)
c  in CNF:
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_2
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_1
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_0
c  in DIMACS:
-17282  17283 -17284 -392 -17285 0
-17282  17283 -17284 -392 -17286 0
-17282  17283 -17284 -392 -17287 0

c  0+1 --> 1
c    (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧  p_392) -> (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0)
c  in CNF:
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_2
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_1
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨  b^{56, 8}_0
c  in DIMACS:
 17282  17283  17284 -392 -17285 0
 17282  17283  17284 -392 -17286 0
 17282  17283  17284 -392  17287 0

c  1+1 --> 2
c    (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0 ∧  p_392) -> (-b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0)
c  in CNF:
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_2
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨  b^{56, 8}_1
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ -p_392 ∨ -b^{56, 8}_0
c  in DIMACS:
 17282  17283 -17284 -392 -17285 0
 17282  17283 -17284 -392  17286 0
 17282  17283 -17284 -392 -17287 0

c  2+1 --> break 
c    (-b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧  p_392) -> break
c  in CNF:
c     b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 17282 -17283  17284 -392 1162 0


c  2-1 --> 1
c    (-b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧ -p_392) -> (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0)
c  in CNF:
c     b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_2
c     b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_1
c     b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨  b^{56, 8}_0
c  in DIMACS:
 17282 -17283  17284  392 -17285 0
 17282 -17283  17284  392 -17286 0
 17282 -17283  17284  392  17287 0

c  1-1 --> 0
c    (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0 ∧ -p_392) -> (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧ -b^{56, 8}_0)
c  in CNF:
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_2
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_1
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_0
c  in DIMACS:
 17282  17283 -17284  392 -17285 0
 17282  17283 -17284  392 -17286 0
 17282  17283 -17284  392 -17287 0

c  0-1 --> -1
c    (-b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧ -p_392) -> ( b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0)
c  in CNF:
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨  b^{56, 8}_2
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_1
c     b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨  b^{56, 8}_0
c  in DIMACS:
 17282  17283  17284  392  17285 0
 17282  17283  17284  392 -17286 0
 17282  17283  17284  392  17287 0

c  -1-1 --> -2
c    ( b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧  b^{56, 7}_0 ∧ -p_392) -> ( b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0)
c  in CNF:
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨  b^{56, 8}_2
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨  b^{56, 8}_1
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨  p_392 ∨ -b^{56, 8}_0
c  in DIMACS:
-17282  17283 -17284  392  17285 0
-17282  17283 -17284  392  17286 0
-17282  17283 -17284  392 -17287 0

c  -2-1 --> break 
c    ( b^{56, 7}_2 ∧  b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨  b^{56, 7}_0 ∨  p_392 ∨ break
c  in DIMACS:
-17282 -17283  17284  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 7}_2 ∧ -b^{56, 7}_1 ∧ -b^{56, 7}_0 ∧ true) 
c  in CNF:
c    -b^{56, 7}_2 ∨  b^{56, 7}_1 ∨  b^{56, 7}_0 ∨ false 
c  in DIMACS:
-17282  17283  17284  0

c  3 does not represent an automaton state.
c    -(-b^{56, 7}_2 ∧  b^{56, 7}_1 ∧  b^{56, 7}_0 ∧ true) 
c  in CNF:
c     b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ false 
c  in DIMACS:
 17282 -17283 -17284  0
c  -3 does not represent an automaton state.
c    -( b^{56, 7}_2 ∧  b^{56, 7}_1 ∧  b^{56, 7}_0 ∧ true) 
c  in CNF:
c    -b^{56, 7}_2 ∨ -b^{56, 7}_1 ∨ -b^{56, 7}_0 ∨ false 
c  in DIMACS:
-17282 -17283 -17284  0

c i = 8
c  -2+1 --> -1
c    ( b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧  p_448) -> ( b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0)
c  in CNF:
c    -b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨  b^{56, 9}_2
c    -b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_1
c    -b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨  b^{56, 9}_0
c  in DIMACS:
-17285 -17286  17287 -448  17288 0
-17285 -17286  17287 -448 -17289 0
-17285 -17286  17287 -448  17290 0

c  -1+1 --> 0
c    ( b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0 ∧  p_448) -> (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧ -b^{56, 9}_0)
c  in CNF:
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_2
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_1
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_0
c  in DIMACS:
-17285  17286 -17287 -448 -17288 0
-17285  17286 -17287 -448 -17289 0
-17285  17286 -17287 -448 -17290 0

c  0+1 --> 1
c    (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧  p_448) -> (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0)
c  in CNF:
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_2
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_1
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨  b^{56, 9}_0
c  in DIMACS:
 17285  17286  17287 -448 -17288 0
 17285  17286  17287 -448 -17289 0
 17285  17286  17287 -448  17290 0

c  1+1 --> 2
c    (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0 ∧  p_448) -> (-b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0)
c  in CNF:
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_2
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨  b^{56, 9}_1
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ -p_448 ∨ -b^{56, 9}_0
c  in DIMACS:
 17285  17286 -17287 -448 -17288 0
 17285  17286 -17287 -448  17289 0
 17285  17286 -17287 -448 -17290 0

c  2+1 --> break 
c    (-b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧  p_448) -> break
c  in CNF:
c     b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 17285 -17286  17287 -448 1162 0


c  2-1 --> 1
c    (-b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧ -p_448) -> (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0)
c  in CNF:
c     b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_2
c     b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_1
c     b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨  b^{56, 9}_0
c  in DIMACS:
 17285 -17286  17287  448 -17288 0
 17285 -17286  17287  448 -17289 0
 17285 -17286  17287  448  17290 0

c  1-1 --> 0
c    (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0 ∧ -p_448) -> (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧ -b^{56, 9}_0)
c  in CNF:
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_2
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_1
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_0
c  in DIMACS:
 17285  17286 -17287  448 -17288 0
 17285  17286 -17287  448 -17289 0
 17285  17286 -17287  448 -17290 0

c  0-1 --> -1
c    (-b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧ -p_448) -> ( b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0)
c  in CNF:
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨  b^{56, 9}_2
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_1
c     b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨  b^{56, 9}_0
c  in DIMACS:
 17285  17286  17287  448  17288 0
 17285  17286  17287  448 -17289 0
 17285  17286  17287  448  17290 0

c  -1-1 --> -2
c    ( b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧  b^{56, 8}_0 ∧ -p_448) -> ( b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0)
c  in CNF:
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨  b^{56, 9}_2
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨  b^{56, 9}_1
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨  p_448 ∨ -b^{56, 9}_0
c  in DIMACS:
-17285  17286 -17287  448  17288 0
-17285  17286 -17287  448  17289 0
-17285  17286 -17287  448 -17290 0

c  -2-1 --> break 
c    ( b^{56, 8}_2 ∧  b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨  b^{56, 8}_0 ∨  p_448 ∨ break
c  in DIMACS:
-17285 -17286  17287  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 8}_2 ∧ -b^{56, 8}_1 ∧ -b^{56, 8}_0 ∧ true) 
c  in CNF:
c    -b^{56, 8}_2 ∨  b^{56, 8}_1 ∨  b^{56, 8}_0 ∨ false 
c  in DIMACS:
-17285  17286  17287  0

c  3 does not represent an automaton state.
c    -(-b^{56, 8}_2 ∧  b^{56, 8}_1 ∧  b^{56, 8}_0 ∧ true) 
c  in CNF:
c     b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ false 
c  in DIMACS:
 17285 -17286 -17287  0
c  -3 does not represent an automaton state.
c    -( b^{56, 8}_2 ∧  b^{56, 8}_1 ∧  b^{56, 8}_0 ∧ true) 
c  in CNF:
c    -b^{56, 8}_2 ∨ -b^{56, 8}_1 ∨ -b^{56, 8}_0 ∨ false 
c  in DIMACS:
-17285 -17286 -17287  0

c i = 9
c  -2+1 --> -1
c    ( b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧  p_504) -> ( b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0)
c  in CNF:
c    -b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨  b^{56, 10}_2
c    -b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_1
c    -b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨  b^{56, 10}_0
c  in DIMACS:
-17288 -17289  17290 -504  17291 0
-17288 -17289  17290 -504 -17292 0
-17288 -17289  17290 -504  17293 0

c  -1+1 --> 0
c    ( b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0 ∧  p_504) -> (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧ -b^{56, 10}_0)
c  in CNF:
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_2
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_1
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_0
c  in DIMACS:
-17288  17289 -17290 -504 -17291 0
-17288  17289 -17290 -504 -17292 0
-17288  17289 -17290 -504 -17293 0

c  0+1 --> 1
c    (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧  p_504) -> (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0)
c  in CNF:
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_2
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_1
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨  b^{56, 10}_0
c  in DIMACS:
 17288  17289  17290 -504 -17291 0
 17288  17289  17290 -504 -17292 0
 17288  17289  17290 -504  17293 0

c  1+1 --> 2
c    (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0 ∧  p_504) -> (-b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0)
c  in CNF:
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_2
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨  b^{56, 10}_1
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ -p_504 ∨ -b^{56, 10}_0
c  in DIMACS:
 17288  17289 -17290 -504 -17291 0
 17288  17289 -17290 -504  17292 0
 17288  17289 -17290 -504 -17293 0

c  2+1 --> break 
c    (-b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧  p_504) -> break
c  in CNF:
c     b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 17288 -17289  17290 -504 1162 0


c  2-1 --> 1
c    (-b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧ -p_504) -> (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0)
c  in CNF:
c     b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_2
c     b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_1
c     b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨  b^{56, 10}_0
c  in DIMACS:
 17288 -17289  17290  504 -17291 0
 17288 -17289  17290  504 -17292 0
 17288 -17289  17290  504  17293 0

c  1-1 --> 0
c    (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0 ∧ -p_504) -> (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧ -b^{56, 10}_0)
c  in CNF:
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_2
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_1
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_0
c  in DIMACS:
 17288  17289 -17290  504 -17291 0
 17288  17289 -17290  504 -17292 0
 17288  17289 -17290  504 -17293 0

c  0-1 --> -1
c    (-b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧ -p_504) -> ( b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0)
c  in CNF:
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨  b^{56, 10}_2
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_1
c     b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨  b^{56, 10}_0
c  in DIMACS:
 17288  17289  17290  504  17291 0
 17288  17289  17290  504 -17292 0
 17288  17289  17290  504  17293 0

c  -1-1 --> -2
c    ( b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧  b^{56, 9}_0 ∧ -p_504) -> ( b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0)
c  in CNF:
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨  b^{56, 10}_2
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨  b^{56, 10}_1
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨  p_504 ∨ -b^{56, 10}_0
c  in DIMACS:
-17288  17289 -17290  504  17291 0
-17288  17289 -17290  504  17292 0
-17288  17289 -17290  504 -17293 0

c  -2-1 --> break 
c    ( b^{56, 9}_2 ∧  b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨  b^{56, 9}_0 ∨  p_504 ∨ break
c  in DIMACS:
-17288 -17289  17290  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 9}_2 ∧ -b^{56, 9}_1 ∧ -b^{56, 9}_0 ∧ true) 
c  in CNF:
c    -b^{56, 9}_2 ∨  b^{56, 9}_1 ∨  b^{56, 9}_0 ∨ false 
c  in DIMACS:
-17288  17289  17290  0

c  3 does not represent an automaton state.
c    -(-b^{56, 9}_2 ∧  b^{56, 9}_1 ∧  b^{56, 9}_0 ∧ true) 
c  in CNF:
c     b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ false 
c  in DIMACS:
 17288 -17289 -17290  0
c  -3 does not represent an automaton state.
c    -( b^{56, 9}_2 ∧  b^{56, 9}_1 ∧  b^{56, 9}_0 ∧ true) 
c  in CNF:
c    -b^{56, 9}_2 ∨ -b^{56, 9}_1 ∨ -b^{56, 9}_0 ∨ false 
c  in DIMACS:
-17288 -17289 -17290  0

c i = 10
c  -2+1 --> -1
c    ( b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧  p_560) -> ( b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0)
c  in CNF:
c    -b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨  b^{56, 11}_2
c    -b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_1
c    -b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨  b^{56, 11}_0
c  in DIMACS:
-17291 -17292  17293 -560  17294 0
-17291 -17292  17293 -560 -17295 0
-17291 -17292  17293 -560  17296 0

c  -1+1 --> 0
c    ( b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0 ∧  p_560) -> (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧ -b^{56, 11}_0)
c  in CNF:
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_2
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_1
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_0
c  in DIMACS:
-17291  17292 -17293 -560 -17294 0
-17291  17292 -17293 -560 -17295 0
-17291  17292 -17293 -560 -17296 0

c  0+1 --> 1
c    (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧  p_560) -> (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0)
c  in CNF:
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_2
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_1
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨  b^{56, 11}_0
c  in DIMACS:
 17291  17292  17293 -560 -17294 0
 17291  17292  17293 -560 -17295 0
 17291  17292  17293 -560  17296 0

c  1+1 --> 2
c    (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0 ∧  p_560) -> (-b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0)
c  in CNF:
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_2
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨  b^{56, 11}_1
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ -p_560 ∨ -b^{56, 11}_0
c  in DIMACS:
 17291  17292 -17293 -560 -17294 0
 17291  17292 -17293 -560  17295 0
 17291  17292 -17293 -560 -17296 0

c  2+1 --> break 
c    (-b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧  p_560) -> break
c  in CNF:
c     b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 17291 -17292  17293 -560 1162 0


c  2-1 --> 1
c    (-b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧ -p_560) -> (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0)
c  in CNF:
c     b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_2
c     b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_1
c     b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨  b^{56, 11}_0
c  in DIMACS:
 17291 -17292  17293  560 -17294 0
 17291 -17292  17293  560 -17295 0
 17291 -17292  17293  560  17296 0

c  1-1 --> 0
c    (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0 ∧ -p_560) -> (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧ -b^{56, 11}_0)
c  in CNF:
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_2
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_1
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_0
c  in DIMACS:
 17291  17292 -17293  560 -17294 0
 17291  17292 -17293  560 -17295 0
 17291  17292 -17293  560 -17296 0

c  0-1 --> -1
c    (-b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧ -p_560) -> ( b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0)
c  in CNF:
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨  b^{56, 11}_2
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_1
c     b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨  b^{56, 11}_0
c  in DIMACS:
 17291  17292  17293  560  17294 0
 17291  17292  17293  560 -17295 0
 17291  17292  17293  560  17296 0

c  -1-1 --> -2
c    ( b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧  b^{56, 10}_0 ∧ -p_560) -> ( b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0)
c  in CNF:
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨  b^{56, 11}_2
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨  b^{56, 11}_1
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨  p_560 ∨ -b^{56, 11}_0
c  in DIMACS:
-17291  17292 -17293  560  17294 0
-17291  17292 -17293  560  17295 0
-17291  17292 -17293  560 -17296 0

c  -2-1 --> break 
c    ( b^{56, 10}_2 ∧  b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨  b^{56, 10}_0 ∨  p_560 ∨ break
c  in DIMACS:
-17291 -17292  17293  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 10}_2 ∧ -b^{56, 10}_1 ∧ -b^{56, 10}_0 ∧ true) 
c  in CNF:
c    -b^{56, 10}_2 ∨  b^{56, 10}_1 ∨  b^{56, 10}_0 ∨ false 
c  in DIMACS:
-17291  17292  17293  0

c  3 does not represent an automaton state.
c    -(-b^{56, 10}_2 ∧  b^{56, 10}_1 ∧  b^{56, 10}_0 ∧ true) 
c  in CNF:
c     b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ false 
c  in DIMACS:
 17291 -17292 -17293  0
c  -3 does not represent an automaton state.
c    -( b^{56, 10}_2 ∧  b^{56, 10}_1 ∧  b^{56, 10}_0 ∧ true) 
c  in CNF:
c    -b^{56, 10}_2 ∨ -b^{56, 10}_1 ∨ -b^{56, 10}_0 ∨ false 
c  in DIMACS:
-17291 -17292 -17293  0

c i = 11
c  -2+1 --> -1
c    ( b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧  p_616) -> ( b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0)
c  in CNF:
c    -b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨  b^{56, 12}_2
c    -b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_1
c    -b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨  b^{56, 12}_0
c  in DIMACS:
-17294 -17295  17296 -616  17297 0
-17294 -17295  17296 -616 -17298 0
-17294 -17295  17296 -616  17299 0

c  -1+1 --> 0
c    ( b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0 ∧  p_616) -> (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧ -b^{56, 12}_0)
c  in CNF:
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_2
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_1
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_0
c  in DIMACS:
-17294  17295 -17296 -616 -17297 0
-17294  17295 -17296 -616 -17298 0
-17294  17295 -17296 -616 -17299 0

c  0+1 --> 1
c    (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧  p_616) -> (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0)
c  in CNF:
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_2
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_1
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨  b^{56, 12}_0
c  in DIMACS:
 17294  17295  17296 -616 -17297 0
 17294  17295  17296 -616 -17298 0
 17294  17295  17296 -616  17299 0

c  1+1 --> 2
c    (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0 ∧  p_616) -> (-b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0)
c  in CNF:
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_2
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨  b^{56, 12}_1
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ -p_616 ∨ -b^{56, 12}_0
c  in DIMACS:
 17294  17295 -17296 -616 -17297 0
 17294  17295 -17296 -616  17298 0
 17294  17295 -17296 -616 -17299 0

c  2+1 --> break 
c    (-b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧  p_616) -> break
c  in CNF:
c     b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 17294 -17295  17296 -616 1162 0


c  2-1 --> 1
c    (-b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧ -p_616) -> (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0)
c  in CNF:
c     b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_2
c     b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_1
c     b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨  b^{56, 12}_0
c  in DIMACS:
 17294 -17295  17296  616 -17297 0
 17294 -17295  17296  616 -17298 0
 17294 -17295  17296  616  17299 0

c  1-1 --> 0
c    (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0 ∧ -p_616) -> (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧ -b^{56, 12}_0)
c  in CNF:
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_2
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_1
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_0
c  in DIMACS:
 17294  17295 -17296  616 -17297 0
 17294  17295 -17296  616 -17298 0
 17294  17295 -17296  616 -17299 0

c  0-1 --> -1
c    (-b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧ -p_616) -> ( b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0)
c  in CNF:
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨  b^{56, 12}_2
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_1
c     b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨  b^{56, 12}_0
c  in DIMACS:
 17294  17295  17296  616  17297 0
 17294  17295  17296  616 -17298 0
 17294  17295  17296  616  17299 0

c  -1-1 --> -2
c    ( b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧  b^{56, 11}_0 ∧ -p_616) -> ( b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0)
c  in CNF:
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨  b^{56, 12}_2
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨  b^{56, 12}_1
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨  p_616 ∨ -b^{56, 12}_0
c  in DIMACS:
-17294  17295 -17296  616  17297 0
-17294  17295 -17296  616  17298 0
-17294  17295 -17296  616 -17299 0

c  -2-1 --> break 
c    ( b^{56, 11}_2 ∧  b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨  b^{56, 11}_0 ∨  p_616 ∨ break
c  in DIMACS:
-17294 -17295  17296  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 11}_2 ∧ -b^{56, 11}_1 ∧ -b^{56, 11}_0 ∧ true) 
c  in CNF:
c    -b^{56, 11}_2 ∨  b^{56, 11}_1 ∨  b^{56, 11}_0 ∨ false 
c  in DIMACS:
-17294  17295  17296  0

c  3 does not represent an automaton state.
c    -(-b^{56, 11}_2 ∧  b^{56, 11}_1 ∧  b^{56, 11}_0 ∧ true) 
c  in CNF:
c     b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ false 
c  in DIMACS:
 17294 -17295 -17296  0
c  -3 does not represent an automaton state.
c    -( b^{56, 11}_2 ∧  b^{56, 11}_1 ∧  b^{56, 11}_0 ∧ true) 
c  in CNF:
c    -b^{56, 11}_2 ∨ -b^{56, 11}_1 ∨ -b^{56, 11}_0 ∨ false 
c  in DIMACS:
-17294 -17295 -17296  0

c i = 12
c  -2+1 --> -1
c    ( b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧  p_672) -> ( b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0)
c  in CNF:
c    -b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨  b^{56, 13}_2
c    -b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_1
c    -b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨  b^{56, 13}_0
c  in DIMACS:
-17297 -17298  17299 -672  17300 0
-17297 -17298  17299 -672 -17301 0
-17297 -17298  17299 -672  17302 0

c  -1+1 --> 0
c    ( b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0 ∧  p_672) -> (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧ -b^{56, 13}_0)
c  in CNF:
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_2
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_1
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_0
c  in DIMACS:
-17297  17298 -17299 -672 -17300 0
-17297  17298 -17299 -672 -17301 0
-17297  17298 -17299 -672 -17302 0

c  0+1 --> 1
c    (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧  p_672) -> (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0)
c  in CNF:
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_2
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_1
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨  b^{56, 13}_0
c  in DIMACS:
 17297  17298  17299 -672 -17300 0
 17297  17298  17299 -672 -17301 0
 17297  17298  17299 -672  17302 0

c  1+1 --> 2
c    (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0 ∧  p_672) -> (-b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0)
c  in CNF:
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_2
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨  b^{56, 13}_1
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ -p_672 ∨ -b^{56, 13}_0
c  in DIMACS:
 17297  17298 -17299 -672 -17300 0
 17297  17298 -17299 -672  17301 0
 17297  17298 -17299 -672 -17302 0

c  2+1 --> break 
c    (-b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧  p_672) -> break
c  in CNF:
c     b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 17297 -17298  17299 -672 1162 0


c  2-1 --> 1
c    (-b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧ -p_672) -> (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0)
c  in CNF:
c     b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_2
c     b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_1
c     b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨  b^{56, 13}_0
c  in DIMACS:
 17297 -17298  17299  672 -17300 0
 17297 -17298  17299  672 -17301 0
 17297 -17298  17299  672  17302 0

c  1-1 --> 0
c    (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0 ∧ -p_672) -> (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧ -b^{56, 13}_0)
c  in CNF:
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_2
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_1
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_0
c  in DIMACS:
 17297  17298 -17299  672 -17300 0
 17297  17298 -17299  672 -17301 0
 17297  17298 -17299  672 -17302 0

c  0-1 --> -1
c    (-b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧ -p_672) -> ( b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0)
c  in CNF:
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨  b^{56, 13}_2
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_1
c     b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨  b^{56, 13}_0
c  in DIMACS:
 17297  17298  17299  672  17300 0
 17297  17298  17299  672 -17301 0
 17297  17298  17299  672  17302 0

c  -1-1 --> -2
c    ( b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧  b^{56, 12}_0 ∧ -p_672) -> ( b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0)
c  in CNF:
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨  b^{56, 13}_2
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨  b^{56, 13}_1
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨  p_672 ∨ -b^{56, 13}_0
c  in DIMACS:
-17297  17298 -17299  672  17300 0
-17297  17298 -17299  672  17301 0
-17297  17298 -17299  672 -17302 0

c  -2-1 --> break 
c    ( b^{56, 12}_2 ∧  b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨  b^{56, 12}_0 ∨  p_672 ∨ break
c  in DIMACS:
-17297 -17298  17299  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 12}_2 ∧ -b^{56, 12}_1 ∧ -b^{56, 12}_0 ∧ true) 
c  in CNF:
c    -b^{56, 12}_2 ∨  b^{56, 12}_1 ∨  b^{56, 12}_0 ∨ false 
c  in DIMACS:
-17297  17298  17299  0

c  3 does not represent an automaton state.
c    -(-b^{56, 12}_2 ∧  b^{56, 12}_1 ∧  b^{56, 12}_0 ∧ true) 
c  in CNF:
c     b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ false 
c  in DIMACS:
 17297 -17298 -17299  0
c  -3 does not represent an automaton state.
c    -( b^{56, 12}_2 ∧  b^{56, 12}_1 ∧  b^{56, 12}_0 ∧ true) 
c  in CNF:
c    -b^{56, 12}_2 ∨ -b^{56, 12}_1 ∨ -b^{56, 12}_0 ∨ false 
c  in DIMACS:
-17297 -17298 -17299  0

c i = 13
c  -2+1 --> -1
c    ( b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧  p_728) -> ( b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0)
c  in CNF:
c    -b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨  b^{56, 14}_2
c    -b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_1
c    -b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨  b^{56, 14}_0
c  in DIMACS:
-17300 -17301  17302 -728  17303 0
-17300 -17301  17302 -728 -17304 0
-17300 -17301  17302 -728  17305 0

c  -1+1 --> 0
c    ( b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0 ∧  p_728) -> (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧ -b^{56, 14}_0)
c  in CNF:
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_2
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_1
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_0
c  in DIMACS:
-17300  17301 -17302 -728 -17303 0
-17300  17301 -17302 -728 -17304 0
-17300  17301 -17302 -728 -17305 0

c  0+1 --> 1
c    (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧  p_728) -> (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0)
c  in CNF:
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_2
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_1
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨  b^{56, 14}_0
c  in DIMACS:
 17300  17301  17302 -728 -17303 0
 17300  17301  17302 -728 -17304 0
 17300  17301  17302 -728  17305 0

c  1+1 --> 2
c    (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0 ∧  p_728) -> (-b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0)
c  in CNF:
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_2
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨  b^{56, 14}_1
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ -p_728 ∨ -b^{56, 14}_0
c  in DIMACS:
 17300  17301 -17302 -728 -17303 0
 17300  17301 -17302 -728  17304 0
 17300  17301 -17302 -728 -17305 0

c  2+1 --> break 
c    (-b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧  p_728) -> break
c  in CNF:
c     b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 17300 -17301  17302 -728 1162 0


c  2-1 --> 1
c    (-b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧ -p_728) -> (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0)
c  in CNF:
c     b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_2
c     b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_1
c     b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨  b^{56, 14}_0
c  in DIMACS:
 17300 -17301  17302  728 -17303 0
 17300 -17301  17302  728 -17304 0
 17300 -17301  17302  728  17305 0

c  1-1 --> 0
c    (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0 ∧ -p_728) -> (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧ -b^{56, 14}_0)
c  in CNF:
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_2
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_1
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_0
c  in DIMACS:
 17300  17301 -17302  728 -17303 0
 17300  17301 -17302  728 -17304 0
 17300  17301 -17302  728 -17305 0

c  0-1 --> -1
c    (-b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧ -p_728) -> ( b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0)
c  in CNF:
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨  b^{56, 14}_2
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_1
c     b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨  b^{56, 14}_0
c  in DIMACS:
 17300  17301  17302  728  17303 0
 17300  17301  17302  728 -17304 0
 17300  17301  17302  728  17305 0

c  -1-1 --> -2
c    ( b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧  b^{56, 13}_0 ∧ -p_728) -> ( b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0)
c  in CNF:
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨  b^{56, 14}_2
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨  b^{56, 14}_1
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨  p_728 ∨ -b^{56, 14}_0
c  in DIMACS:
-17300  17301 -17302  728  17303 0
-17300  17301 -17302  728  17304 0
-17300  17301 -17302  728 -17305 0

c  -2-1 --> break 
c    ( b^{56, 13}_2 ∧  b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨  b^{56, 13}_0 ∨  p_728 ∨ break
c  in DIMACS:
-17300 -17301  17302  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 13}_2 ∧ -b^{56, 13}_1 ∧ -b^{56, 13}_0 ∧ true) 
c  in CNF:
c    -b^{56, 13}_2 ∨  b^{56, 13}_1 ∨  b^{56, 13}_0 ∨ false 
c  in DIMACS:
-17300  17301  17302  0

c  3 does not represent an automaton state.
c    -(-b^{56, 13}_2 ∧  b^{56, 13}_1 ∧  b^{56, 13}_0 ∧ true) 
c  in CNF:
c     b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ false 
c  in DIMACS:
 17300 -17301 -17302  0
c  -3 does not represent an automaton state.
c    -( b^{56, 13}_2 ∧  b^{56, 13}_1 ∧  b^{56, 13}_0 ∧ true) 
c  in CNF:
c    -b^{56, 13}_2 ∨ -b^{56, 13}_1 ∨ -b^{56, 13}_0 ∨ false 
c  in DIMACS:
-17300 -17301 -17302  0

c i = 14
c  -2+1 --> -1
c    ( b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧  p_784) -> ( b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0)
c  in CNF:
c    -b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨  b^{56, 15}_2
c    -b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_1
c    -b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨  b^{56, 15}_0
c  in DIMACS:
-17303 -17304  17305 -784  17306 0
-17303 -17304  17305 -784 -17307 0
-17303 -17304  17305 -784  17308 0

c  -1+1 --> 0
c    ( b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0 ∧  p_784) -> (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧ -b^{56, 15}_0)
c  in CNF:
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_2
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_1
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_0
c  in DIMACS:
-17303  17304 -17305 -784 -17306 0
-17303  17304 -17305 -784 -17307 0
-17303  17304 -17305 -784 -17308 0

c  0+1 --> 1
c    (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧  p_784) -> (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0)
c  in CNF:
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_2
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_1
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨  b^{56, 15}_0
c  in DIMACS:
 17303  17304  17305 -784 -17306 0
 17303  17304  17305 -784 -17307 0
 17303  17304  17305 -784  17308 0

c  1+1 --> 2
c    (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0 ∧  p_784) -> (-b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0)
c  in CNF:
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_2
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨  b^{56, 15}_1
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ -p_784 ∨ -b^{56, 15}_0
c  in DIMACS:
 17303  17304 -17305 -784 -17306 0
 17303  17304 -17305 -784  17307 0
 17303  17304 -17305 -784 -17308 0

c  2+1 --> break 
c    (-b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧  p_784) -> break
c  in CNF:
c     b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 17303 -17304  17305 -784 1162 0


c  2-1 --> 1
c    (-b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧ -p_784) -> (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0)
c  in CNF:
c     b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_2
c     b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_1
c     b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨  b^{56, 15}_0
c  in DIMACS:
 17303 -17304  17305  784 -17306 0
 17303 -17304  17305  784 -17307 0
 17303 -17304  17305  784  17308 0

c  1-1 --> 0
c    (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0 ∧ -p_784) -> (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧ -b^{56, 15}_0)
c  in CNF:
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_2
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_1
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_0
c  in DIMACS:
 17303  17304 -17305  784 -17306 0
 17303  17304 -17305  784 -17307 0
 17303  17304 -17305  784 -17308 0

c  0-1 --> -1
c    (-b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧ -p_784) -> ( b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0)
c  in CNF:
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨  b^{56, 15}_2
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_1
c     b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨  b^{56, 15}_0
c  in DIMACS:
 17303  17304  17305  784  17306 0
 17303  17304  17305  784 -17307 0
 17303  17304  17305  784  17308 0

c  -1-1 --> -2
c    ( b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧  b^{56, 14}_0 ∧ -p_784) -> ( b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0)
c  in CNF:
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨  b^{56, 15}_2
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨  b^{56, 15}_1
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨  p_784 ∨ -b^{56, 15}_0
c  in DIMACS:
-17303  17304 -17305  784  17306 0
-17303  17304 -17305  784  17307 0
-17303  17304 -17305  784 -17308 0

c  -2-1 --> break 
c    ( b^{56, 14}_2 ∧  b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨  b^{56, 14}_0 ∨  p_784 ∨ break
c  in DIMACS:
-17303 -17304  17305  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 14}_2 ∧ -b^{56, 14}_1 ∧ -b^{56, 14}_0 ∧ true) 
c  in CNF:
c    -b^{56, 14}_2 ∨  b^{56, 14}_1 ∨  b^{56, 14}_0 ∨ false 
c  in DIMACS:
-17303  17304  17305  0

c  3 does not represent an automaton state.
c    -(-b^{56, 14}_2 ∧  b^{56, 14}_1 ∧  b^{56, 14}_0 ∧ true) 
c  in CNF:
c     b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ false 
c  in DIMACS:
 17303 -17304 -17305  0
c  -3 does not represent an automaton state.
c    -( b^{56, 14}_2 ∧  b^{56, 14}_1 ∧  b^{56, 14}_0 ∧ true) 
c  in CNF:
c    -b^{56, 14}_2 ∨ -b^{56, 14}_1 ∨ -b^{56, 14}_0 ∨ false 
c  in DIMACS:
-17303 -17304 -17305  0

c i = 15
c  -2+1 --> -1
c    ( b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧  p_840) -> ( b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0)
c  in CNF:
c    -b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨  b^{56, 16}_2
c    -b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_1
c    -b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨  b^{56, 16}_0
c  in DIMACS:
-17306 -17307  17308 -840  17309 0
-17306 -17307  17308 -840 -17310 0
-17306 -17307  17308 -840  17311 0

c  -1+1 --> 0
c    ( b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0 ∧  p_840) -> (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧ -b^{56, 16}_0)
c  in CNF:
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_2
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_1
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_0
c  in DIMACS:
-17306  17307 -17308 -840 -17309 0
-17306  17307 -17308 -840 -17310 0
-17306  17307 -17308 -840 -17311 0

c  0+1 --> 1
c    (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧  p_840) -> (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0)
c  in CNF:
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_2
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_1
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨  b^{56, 16}_0
c  in DIMACS:
 17306  17307  17308 -840 -17309 0
 17306  17307  17308 -840 -17310 0
 17306  17307  17308 -840  17311 0

c  1+1 --> 2
c    (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0 ∧  p_840) -> (-b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0)
c  in CNF:
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_2
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨  b^{56, 16}_1
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ -p_840 ∨ -b^{56, 16}_0
c  in DIMACS:
 17306  17307 -17308 -840 -17309 0
 17306  17307 -17308 -840  17310 0
 17306  17307 -17308 -840 -17311 0

c  2+1 --> break 
c    (-b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧  p_840) -> break
c  in CNF:
c     b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 17306 -17307  17308 -840 1162 0


c  2-1 --> 1
c    (-b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧ -p_840) -> (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0)
c  in CNF:
c     b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_2
c     b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_1
c     b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨  b^{56, 16}_0
c  in DIMACS:
 17306 -17307  17308  840 -17309 0
 17306 -17307  17308  840 -17310 0
 17306 -17307  17308  840  17311 0

c  1-1 --> 0
c    (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0 ∧ -p_840) -> (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧ -b^{56, 16}_0)
c  in CNF:
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_2
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_1
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_0
c  in DIMACS:
 17306  17307 -17308  840 -17309 0
 17306  17307 -17308  840 -17310 0
 17306  17307 -17308  840 -17311 0

c  0-1 --> -1
c    (-b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧ -p_840) -> ( b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0)
c  in CNF:
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨  b^{56, 16}_2
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_1
c     b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨  b^{56, 16}_0
c  in DIMACS:
 17306  17307  17308  840  17309 0
 17306  17307  17308  840 -17310 0
 17306  17307  17308  840  17311 0

c  -1-1 --> -2
c    ( b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧  b^{56, 15}_0 ∧ -p_840) -> ( b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0)
c  in CNF:
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨  b^{56, 16}_2
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨  b^{56, 16}_1
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨  p_840 ∨ -b^{56, 16}_0
c  in DIMACS:
-17306  17307 -17308  840  17309 0
-17306  17307 -17308  840  17310 0
-17306  17307 -17308  840 -17311 0

c  -2-1 --> break 
c    ( b^{56, 15}_2 ∧  b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨  b^{56, 15}_0 ∨  p_840 ∨ break
c  in DIMACS:
-17306 -17307  17308  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 15}_2 ∧ -b^{56, 15}_1 ∧ -b^{56, 15}_0 ∧ true) 
c  in CNF:
c    -b^{56, 15}_2 ∨  b^{56, 15}_1 ∨  b^{56, 15}_0 ∨ false 
c  in DIMACS:
-17306  17307  17308  0

c  3 does not represent an automaton state.
c    -(-b^{56, 15}_2 ∧  b^{56, 15}_1 ∧  b^{56, 15}_0 ∧ true) 
c  in CNF:
c     b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ false 
c  in DIMACS:
 17306 -17307 -17308  0
c  -3 does not represent an automaton state.
c    -( b^{56, 15}_2 ∧  b^{56, 15}_1 ∧  b^{56, 15}_0 ∧ true) 
c  in CNF:
c    -b^{56, 15}_2 ∨ -b^{56, 15}_1 ∨ -b^{56, 15}_0 ∨ false 
c  in DIMACS:
-17306 -17307 -17308  0

c i = 16
c  -2+1 --> -1
c    ( b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧  p_896) -> ( b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0)
c  in CNF:
c    -b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨  b^{56, 17}_2
c    -b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_1
c    -b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨  b^{56, 17}_0
c  in DIMACS:
-17309 -17310  17311 -896  17312 0
-17309 -17310  17311 -896 -17313 0
-17309 -17310  17311 -896  17314 0

c  -1+1 --> 0
c    ( b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0 ∧  p_896) -> (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧ -b^{56, 17}_0)
c  in CNF:
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_2
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_1
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_0
c  in DIMACS:
-17309  17310 -17311 -896 -17312 0
-17309  17310 -17311 -896 -17313 0
-17309  17310 -17311 -896 -17314 0

c  0+1 --> 1
c    (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧  p_896) -> (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0)
c  in CNF:
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_2
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_1
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨  b^{56, 17}_0
c  in DIMACS:
 17309  17310  17311 -896 -17312 0
 17309  17310  17311 -896 -17313 0
 17309  17310  17311 -896  17314 0

c  1+1 --> 2
c    (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0 ∧  p_896) -> (-b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0)
c  in CNF:
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_2
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨  b^{56, 17}_1
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ -p_896 ∨ -b^{56, 17}_0
c  in DIMACS:
 17309  17310 -17311 -896 -17312 0
 17309  17310 -17311 -896  17313 0
 17309  17310 -17311 -896 -17314 0

c  2+1 --> break 
c    (-b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧  p_896) -> break
c  in CNF:
c     b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 17309 -17310  17311 -896 1162 0


c  2-1 --> 1
c    (-b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧ -p_896) -> (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0)
c  in CNF:
c     b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_2
c     b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_1
c     b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨  b^{56, 17}_0
c  in DIMACS:
 17309 -17310  17311  896 -17312 0
 17309 -17310  17311  896 -17313 0
 17309 -17310  17311  896  17314 0

c  1-1 --> 0
c    (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0 ∧ -p_896) -> (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧ -b^{56, 17}_0)
c  in CNF:
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_2
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_1
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_0
c  in DIMACS:
 17309  17310 -17311  896 -17312 0
 17309  17310 -17311  896 -17313 0
 17309  17310 -17311  896 -17314 0

c  0-1 --> -1
c    (-b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧ -p_896) -> ( b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0)
c  in CNF:
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨  b^{56, 17}_2
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_1
c     b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨  b^{56, 17}_0
c  in DIMACS:
 17309  17310  17311  896  17312 0
 17309  17310  17311  896 -17313 0
 17309  17310  17311  896  17314 0

c  -1-1 --> -2
c    ( b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧  b^{56, 16}_0 ∧ -p_896) -> ( b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0)
c  in CNF:
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨  b^{56, 17}_2
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨  b^{56, 17}_1
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨  p_896 ∨ -b^{56, 17}_0
c  in DIMACS:
-17309  17310 -17311  896  17312 0
-17309  17310 -17311  896  17313 0
-17309  17310 -17311  896 -17314 0

c  -2-1 --> break 
c    ( b^{56, 16}_2 ∧  b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨  b^{56, 16}_0 ∨  p_896 ∨ break
c  in DIMACS:
-17309 -17310  17311  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 16}_2 ∧ -b^{56, 16}_1 ∧ -b^{56, 16}_0 ∧ true) 
c  in CNF:
c    -b^{56, 16}_2 ∨  b^{56, 16}_1 ∨  b^{56, 16}_0 ∨ false 
c  in DIMACS:
-17309  17310  17311  0

c  3 does not represent an automaton state.
c    -(-b^{56, 16}_2 ∧  b^{56, 16}_1 ∧  b^{56, 16}_0 ∧ true) 
c  in CNF:
c     b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ false 
c  in DIMACS:
 17309 -17310 -17311  0
c  -3 does not represent an automaton state.
c    -( b^{56, 16}_2 ∧  b^{56, 16}_1 ∧  b^{56, 16}_0 ∧ true) 
c  in CNF:
c    -b^{56, 16}_2 ∨ -b^{56, 16}_1 ∨ -b^{56, 16}_0 ∨ false 
c  in DIMACS:
-17309 -17310 -17311  0

c i = 17
c  -2+1 --> -1
c    ( b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧  p_952) -> ( b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0)
c  in CNF:
c    -b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨  b^{56, 18}_2
c    -b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_1
c    -b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨  b^{56, 18}_0
c  in DIMACS:
-17312 -17313  17314 -952  17315 0
-17312 -17313  17314 -952 -17316 0
-17312 -17313  17314 -952  17317 0

c  -1+1 --> 0
c    ( b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0 ∧  p_952) -> (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧ -b^{56, 18}_0)
c  in CNF:
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_2
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_1
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_0
c  in DIMACS:
-17312  17313 -17314 -952 -17315 0
-17312  17313 -17314 -952 -17316 0
-17312  17313 -17314 -952 -17317 0

c  0+1 --> 1
c    (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧  p_952) -> (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0)
c  in CNF:
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_2
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_1
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨  b^{56, 18}_0
c  in DIMACS:
 17312  17313  17314 -952 -17315 0
 17312  17313  17314 -952 -17316 0
 17312  17313  17314 -952  17317 0

c  1+1 --> 2
c    (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0 ∧  p_952) -> (-b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0)
c  in CNF:
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_2
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨  b^{56, 18}_1
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ -p_952 ∨ -b^{56, 18}_0
c  in DIMACS:
 17312  17313 -17314 -952 -17315 0
 17312  17313 -17314 -952  17316 0
 17312  17313 -17314 -952 -17317 0

c  2+1 --> break 
c    (-b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧  p_952) -> break
c  in CNF:
c     b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 17312 -17313  17314 -952 1162 0


c  2-1 --> 1
c    (-b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧ -p_952) -> (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0)
c  in CNF:
c     b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_2
c     b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_1
c     b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨  b^{56, 18}_0
c  in DIMACS:
 17312 -17313  17314  952 -17315 0
 17312 -17313  17314  952 -17316 0
 17312 -17313  17314  952  17317 0

c  1-1 --> 0
c    (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0 ∧ -p_952) -> (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧ -b^{56, 18}_0)
c  in CNF:
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_2
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_1
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_0
c  in DIMACS:
 17312  17313 -17314  952 -17315 0
 17312  17313 -17314  952 -17316 0
 17312  17313 -17314  952 -17317 0

c  0-1 --> -1
c    (-b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧ -p_952) -> ( b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0)
c  in CNF:
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨  b^{56, 18}_2
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_1
c     b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨  b^{56, 18}_0
c  in DIMACS:
 17312  17313  17314  952  17315 0
 17312  17313  17314  952 -17316 0
 17312  17313  17314  952  17317 0

c  -1-1 --> -2
c    ( b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧  b^{56, 17}_0 ∧ -p_952) -> ( b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0)
c  in CNF:
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨  b^{56, 18}_2
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨  b^{56, 18}_1
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨  p_952 ∨ -b^{56, 18}_0
c  in DIMACS:
-17312  17313 -17314  952  17315 0
-17312  17313 -17314  952  17316 0
-17312  17313 -17314  952 -17317 0

c  -2-1 --> break 
c    ( b^{56, 17}_2 ∧  b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨  b^{56, 17}_0 ∨  p_952 ∨ break
c  in DIMACS:
-17312 -17313  17314  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 17}_2 ∧ -b^{56, 17}_1 ∧ -b^{56, 17}_0 ∧ true) 
c  in CNF:
c    -b^{56, 17}_2 ∨  b^{56, 17}_1 ∨  b^{56, 17}_0 ∨ false 
c  in DIMACS:
-17312  17313  17314  0

c  3 does not represent an automaton state.
c    -(-b^{56, 17}_2 ∧  b^{56, 17}_1 ∧  b^{56, 17}_0 ∧ true) 
c  in CNF:
c     b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ false 
c  in DIMACS:
 17312 -17313 -17314  0
c  -3 does not represent an automaton state.
c    -( b^{56, 17}_2 ∧  b^{56, 17}_1 ∧  b^{56, 17}_0 ∧ true) 
c  in CNF:
c    -b^{56, 17}_2 ∨ -b^{56, 17}_1 ∨ -b^{56, 17}_0 ∨ false 
c  in DIMACS:
-17312 -17313 -17314  0

c i = 18
c  -2+1 --> -1
c    ( b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧  p_1008) -> ( b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0)
c  in CNF:
c    -b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨  b^{56, 19}_2
c    -b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_1
c    -b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨  b^{56, 19}_0
c  in DIMACS:
-17315 -17316  17317 -1008  17318 0
-17315 -17316  17317 -1008 -17319 0
-17315 -17316  17317 -1008  17320 0

c  -1+1 --> 0
c    ( b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0 ∧  p_1008) -> (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧ -b^{56, 19}_0)
c  in CNF:
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_2
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_1
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_0
c  in DIMACS:
-17315  17316 -17317 -1008 -17318 0
-17315  17316 -17317 -1008 -17319 0
-17315  17316 -17317 -1008 -17320 0

c  0+1 --> 1
c    (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧  p_1008) -> (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0)
c  in CNF:
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_2
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_1
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨  b^{56, 19}_0
c  in DIMACS:
 17315  17316  17317 -1008 -17318 0
 17315  17316  17317 -1008 -17319 0
 17315  17316  17317 -1008  17320 0

c  1+1 --> 2
c    (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0 ∧  p_1008) -> (-b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0)
c  in CNF:
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_2
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨  b^{56, 19}_1
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ -p_1008 ∨ -b^{56, 19}_0
c  in DIMACS:
 17315  17316 -17317 -1008 -17318 0
 17315  17316 -17317 -1008  17319 0
 17315  17316 -17317 -1008 -17320 0

c  2+1 --> break 
c    (-b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 17315 -17316  17317 -1008 1162 0


c  2-1 --> 1
c    (-b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧ -p_1008) -> (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0)
c  in CNF:
c     b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_2
c     b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_1
c     b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨  b^{56, 19}_0
c  in DIMACS:
 17315 -17316  17317  1008 -17318 0
 17315 -17316  17317  1008 -17319 0
 17315 -17316  17317  1008  17320 0

c  1-1 --> 0
c    (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0 ∧ -p_1008) -> (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧ -b^{56, 19}_0)
c  in CNF:
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_2
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_1
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_0
c  in DIMACS:
 17315  17316 -17317  1008 -17318 0
 17315  17316 -17317  1008 -17319 0
 17315  17316 -17317  1008 -17320 0

c  0-1 --> -1
c    (-b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧ -p_1008) -> ( b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0)
c  in CNF:
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨  b^{56, 19}_2
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_1
c     b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨  b^{56, 19}_0
c  in DIMACS:
 17315  17316  17317  1008  17318 0
 17315  17316  17317  1008 -17319 0
 17315  17316  17317  1008  17320 0

c  -1-1 --> -2
c    ( b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧  b^{56, 18}_0 ∧ -p_1008) -> ( b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0)
c  in CNF:
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨  b^{56, 19}_2
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨  b^{56, 19}_1
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨  p_1008 ∨ -b^{56, 19}_0
c  in DIMACS:
-17315  17316 -17317  1008  17318 0
-17315  17316 -17317  1008  17319 0
-17315  17316 -17317  1008 -17320 0

c  -2-1 --> break 
c    ( b^{56, 18}_2 ∧  b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨  b^{56, 18}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-17315 -17316  17317  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 18}_2 ∧ -b^{56, 18}_1 ∧ -b^{56, 18}_0 ∧ true) 
c  in CNF:
c    -b^{56, 18}_2 ∨  b^{56, 18}_1 ∨  b^{56, 18}_0 ∨ false 
c  in DIMACS:
-17315  17316  17317  0

c  3 does not represent an automaton state.
c    -(-b^{56, 18}_2 ∧  b^{56, 18}_1 ∧  b^{56, 18}_0 ∧ true) 
c  in CNF:
c     b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ false 
c  in DIMACS:
 17315 -17316 -17317  0
c  -3 does not represent an automaton state.
c    -( b^{56, 18}_2 ∧  b^{56, 18}_1 ∧  b^{56, 18}_0 ∧ true) 
c  in CNF:
c    -b^{56, 18}_2 ∨ -b^{56, 18}_1 ∨ -b^{56, 18}_0 ∨ false 
c  in DIMACS:
-17315 -17316 -17317  0

c i = 19
c  -2+1 --> -1
c    ( b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧  p_1064) -> ( b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0)
c  in CNF:
c    -b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨  b^{56, 20}_2
c    -b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_1
c    -b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨  b^{56, 20}_0
c  in DIMACS:
-17318 -17319  17320 -1064  17321 0
-17318 -17319  17320 -1064 -17322 0
-17318 -17319  17320 -1064  17323 0

c  -1+1 --> 0
c    ( b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0 ∧  p_1064) -> (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧ -b^{56, 20}_0)
c  in CNF:
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_2
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_1
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_0
c  in DIMACS:
-17318  17319 -17320 -1064 -17321 0
-17318  17319 -17320 -1064 -17322 0
-17318  17319 -17320 -1064 -17323 0

c  0+1 --> 1
c    (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧  p_1064) -> (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0)
c  in CNF:
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_2
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_1
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨  b^{56, 20}_0
c  in DIMACS:
 17318  17319  17320 -1064 -17321 0
 17318  17319  17320 -1064 -17322 0
 17318  17319  17320 -1064  17323 0

c  1+1 --> 2
c    (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0 ∧  p_1064) -> (-b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0)
c  in CNF:
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_2
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨  b^{56, 20}_1
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ -p_1064 ∨ -b^{56, 20}_0
c  in DIMACS:
 17318  17319 -17320 -1064 -17321 0
 17318  17319 -17320 -1064  17322 0
 17318  17319 -17320 -1064 -17323 0

c  2+1 --> break 
c    (-b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 17318 -17319  17320 -1064 1162 0


c  2-1 --> 1
c    (-b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧ -p_1064) -> (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0)
c  in CNF:
c     b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_2
c     b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_1
c     b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨  b^{56, 20}_0
c  in DIMACS:
 17318 -17319  17320  1064 -17321 0
 17318 -17319  17320  1064 -17322 0
 17318 -17319  17320  1064  17323 0

c  1-1 --> 0
c    (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0 ∧ -p_1064) -> (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧ -b^{56, 20}_0)
c  in CNF:
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_2
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_1
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_0
c  in DIMACS:
 17318  17319 -17320  1064 -17321 0
 17318  17319 -17320  1064 -17322 0
 17318  17319 -17320  1064 -17323 0

c  0-1 --> -1
c    (-b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧ -p_1064) -> ( b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0)
c  in CNF:
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨  b^{56, 20}_2
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_1
c     b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨  b^{56, 20}_0
c  in DIMACS:
 17318  17319  17320  1064  17321 0
 17318  17319  17320  1064 -17322 0
 17318  17319  17320  1064  17323 0

c  -1-1 --> -2
c    ( b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧  b^{56, 19}_0 ∧ -p_1064) -> ( b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0)
c  in CNF:
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨  b^{56, 20}_2
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨  b^{56, 20}_1
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨  p_1064 ∨ -b^{56, 20}_0
c  in DIMACS:
-17318  17319 -17320  1064  17321 0
-17318  17319 -17320  1064  17322 0
-17318  17319 -17320  1064 -17323 0

c  -2-1 --> break 
c    ( b^{56, 19}_2 ∧  b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨  b^{56, 19}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-17318 -17319  17320  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 19}_2 ∧ -b^{56, 19}_1 ∧ -b^{56, 19}_0 ∧ true) 
c  in CNF:
c    -b^{56, 19}_2 ∨  b^{56, 19}_1 ∨  b^{56, 19}_0 ∨ false 
c  in DIMACS:
-17318  17319  17320  0

c  3 does not represent an automaton state.
c    -(-b^{56, 19}_2 ∧  b^{56, 19}_1 ∧  b^{56, 19}_0 ∧ true) 
c  in CNF:
c     b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ false 
c  in DIMACS:
 17318 -17319 -17320  0
c  -3 does not represent an automaton state.
c    -( b^{56, 19}_2 ∧  b^{56, 19}_1 ∧  b^{56, 19}_0 ∧ true) 
c  in CNF:
c    -b^{56, 19}_2 ∨ -b^{56, 19}_1 ∨ -b^{56, 19}_0 ∨ false 
c  in DIMACS:
-17318 -17319 -17320  0

c i = 20
c  -2+1 --> -1
c    ( b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧  p_1120) -> ( b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧  b^{56, 21}_0)
c  in CNF:
c    -b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨  b^{56, 21}_2
c    -b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_1
c    -b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨  b^{56, 21}_0
c  in DIMACS:
-17321 -17322  17323 -1120  17324 0
-17321 -17322  17323 -1120 -17325 0
-17321 -17322  17323 -1120  17326 0

c  -1+1 --> 0
c    ( b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0 ∧  p_1120) -> (-b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧ -b^{56, 21}_0)
c  in CNF:
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_2
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_1
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_0
c  in DIMACS:
-17321  17322 -17323 -1120 -17324 0
-17321  17322 -17323 -1120 -17325 0
-17321  17322 -17323 -1120 -17326 0

c  0+1 --> 1
c    (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧  p_1120) -> (-b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧  b^{56, 21}_0)
c  in CNF:
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_2
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_1
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨  b^{56, 21}_0
c  in DIMACS:
 17321  17322  17323 -1120 -17324 0
 17321  17322  17323 -1120 -17325 0
 17321  17322  17323 -1120  17326 0

c  1+1 --> 2
c    (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0 ∧  p_1120) -> (-b^{56, 21}_2 ∧  b^{56, 21}_1 ∧ -b^{56, 21}_0)
c  in CNF:
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_2
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨  b^{56, 21}_1
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ -p_1120 ∨ -b^{56, 21}_0
c  in DIMACS:
 17321  17322 -17323 -1120 -17324 0
 17321  17322 -17323 -1120  17325 0
 17321  17322 -17323 -1120 -17326 0

c  2+1 --> break 
c    (-b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 17321 -17322  17323 -1120 1162 0


c  2-1 --> 1
c    (-b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧ -p_1120) -> (-b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧  b^{56, 21}_0)
c  in CNF:
c     b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_2
c     b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_1
c     b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨  b^{56, 21}_0
c  in DIMACS:
 17321 -17322  17323  1120 -17324 0
 17321 -17322  17323  1120 -17325 0
 17321 -17322  17323  1120  17326 0

c  1-1 --> 0
c    (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0 ∧ -p_1120) -> (-b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧ -b^{56, 21}_0)
c  in CNF:
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_2
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_1
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_0
c  in DIMACS:
 17321  17322 -17323  1120 -17324 0
 17321  17322 -17323  1120 -17325 0
 17321  17322 -17323  1120 -17326 0

c  0-1 --> -1
c    (-b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧ -p_1120) -> ( b^{56, 21}_2 ∧ -b^{56, 21}_1 ∧  b^{56, 21}_0)
c  in CNF:
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨  b^{56, 21}_2
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_1
c     b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨  b^{56, 21}_0
c  in DIMACS:
 17321  17322  17323  1120  17324 0
 17321  17322  17323  1120 -17325 0
 17321  17322  17323  1120  17326 0

c  -1-1 --> -2
c    ( b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧  b^{56, 20}_0 ∧ -p_1120) -> ( b^{56, 21}_2 ∧  b^{56, 21}_1 ∧ -b^{56, 21}_0)
c  in CNF:
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨  b^{56, 21}_2
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨  b^{56, 21}_1
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨  p_1120 ∨ -b^{56, 21}_0
c  in DIMACS:
-17321  17322 -17323  1120  17324 0
-17321  17322 -17323  1120  17325 0
-17321  17322 -17323  1120 -17326 0

c  -2-1 --> break 
c    ( b^{56, 20}_2 ∧  b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨  b^{56, 20}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-17321 -17322  17323  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{56, 20}_2 ∧ -b^{56, 20}_1 ∧ -b^{56, 20}_0 ∧ true) 
c  in CNF:
c    -b^{56, 20}_2 ∨  b^{56, 20}_1 ∨  b^{56, 20}_0 ∨ false 
c  in DIMACS:
-17321  17322  17323  0

c  3 does not represent an automaton state.
c    -(-b^{56, 20}_2 ∧  b^{56, 20}_1 ∧  b^{56, 20}_0 ∧ true) 
c  in CNF:
c     b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ false 
c  in DIMACS:
 17321 -17322 -17323  0
c  -3 does not represent an automaton state.
c    -( b^{56, 20}_2 ∧  b^{56, 20}_1 ∧  b^{56, 20}_0 ∧ true) 
c  in CNF:
c    -b^{56, 20}_2 ∨ -b^{56, 20}_1 ∨ -b^{56, 20}_0 ∨ false 
c  in DIMACS:
-17321 -17322 -17323  0

c INIT for k = 57
c    -b^{57, 1}_2
c    -b^{57, 1}_1
c    -b^{57, 1}_0
c  in DIMACS:
-17327 0
-17328 0
-17329 0

c Transitions for k = 57
c i = 1
c  -2+1 --> -1
c    ( b^{57, 1}_2 ∧  b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧  p_57) -> ( b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0)
c  in CNF:
c    -b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨  b^{57, 2}_2
c    -b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_1
c    -b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨  b^{57, 2}_0
c  in DIMACS:
-17327 -17328  17329 -57  17330 0
-17327 -17328  17329 -57 -17331 0
-17327 -17328  17329 -57  17332 0

c  -1+1 --> 0
c    ( b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧  b^{57, 1}_0 ∧  p_57) -> (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧ -b^{57, 2}_0)
c  in CNF:
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_2
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_1
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_0
c  in DIMACS:
-17327  17328 -17329 -57 -17330 0
-17327  17328 -17329 -57 -17331 0
-17327  17328 -17329 -57 -17332 0

c  0+1 --> 1
c    (-b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧  p_57) -> (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0)
c  in CNF:
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_2
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_1
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨  b^{57, 2}_0
c  in DIMACS:
 17327  17328  17329 -57 -17330 0
 17327  17328  17329 -57 -17331 0
 17327  17328  17329 -57  17332 0

c  1+1 --> 2
c    (-b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧  b^{57, 1}_0 ∧  p_57) -> (-b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0)
c  in CNF:
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_2
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨  b^{57, 2}_1
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ -p_57 ∨ -b^{57, 2}_0
c  in DIMACS:
 17327  17328 -17329 -57 -17330 0
 17327  17328 -17329 -57  17331 0
 17327  17328 -17329 -57 -17332 0

c  2+1 --> break 
c    (-b^{57, 1}_2 ∧  b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧  p_57) -> break
c  in CNF:
c     b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ -p_57 ∨ break
c  in DIMACS:
 17327 -17328  17329 -57 1162 0


c  2-1 --> 1
c    (-b^{57, 1}_2 ∧  b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧ -p_57) -> (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0)
c  in CNF:
c     b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_2
c     b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_1
c     b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨  b^{57, 2}_0
c  in DIMACS:
 17327 -17328  17329  57 -17330 0
 17327 -17328  17329  57 -17331 0
 17327 -17328  17329  57  17332 0

c  1-1 --> 0
c    (-b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧  b^{57, 1}_0 ∧ -p_57) -> (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧ -b^{57, 2}_0)
c  in CNF:
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_2
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_1
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_0
c  in DIMACS:
 17327  17328 -17329  57 -17330 0
 17327  17328 -17329  57 -17331 0
 17327  17328 -17329  57 -17332 0

c  0-1 --> -1
c    (-b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧ -p_57) -> ( b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0)
c  in CNF:
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨  b^{57, 2}_2
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_1
c     b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨  b^{57, 2}_0
c  in DIMACS:
 17327  17328  17329  57  17330 0
 17327  17328  17329  57 -17331 0
 17327  17328  17329  57  17332 0

c  -1-1 --> -2
c    ( b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧  b^{57, 1}_0 ∧ -p_57) -> ( b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0)
c  in CNF:
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨  b^{57, 2}_2
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨  b^{57, 2}_1
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨  p_57 ∨ -b^{57, 2}_0
c  in DIMACS:
-17327  17328 -17329  57  17330 0
-17327  17328 -17329  57  17331 0
-17327  17328 -17329  57 -17332 0

c  -2-1 --> break 
c    ( b^{57, 1}_2 ∧  b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧ -p_57) -> break
c  in CNF:
c    -b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨  b^{57, 1}_0 ∨  p_57 ∨ break
c  in DIMACS:
-17327 -17328  17329  57 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 1}_2 ∧ -b^{57, 1}_1 ∧ -b^{57, 1}_0 ∧ true) 
c  in CNF:
c    -b^{57, 1}_2 ∨  b^{57, 1}_1 ∨  b^{57, 1}_0 ∨ false 
c  in DIMACS:
-17327  17328  17329  0

c  3 does not represent an automaton state.
c    -(-b^{57, 1}_2 ∧  b^{57, 1}_1 ∧  b^{57, 1}_0 ∧ true) 
c  in CNF:
c     b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ false 
c  in DIMACS:
 17327 -17328 -17329  0
c  -3 does not represent an automaton state.
c    -( b^{57, 1}_2 ∧  b^{57, 1}_1 ∧  b^{57, 1}_0 ∧ true) 
c  in CNF:
c    -b^{57, 1}_2 ∨ -b^{57, 1}_1 ∨ -b^{57, 1}_0 ∨ false 
c  in DIMACS:
-17327 -17328 -17329  0

c i = 2
c  -2+1 --> -1
c    ( b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧  p_114) -> ( b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0)
c  in CNF:
c    -b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨  b^{57, 3}_2
c    -b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_1
c    -b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨  b^{57, 3}_0
c  in DIMACS:
-17330 -17331  17332 -114  17333 0
-17330 -17331  17332 -114 -17334 0
-17330 -17331  17332 -114  17335 0

c  -1+1 --> 0
c    ( b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0 ∧  p_114) -> (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧ -b^{57, 3}_0)
c  in CNF:
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_2
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_1
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_0
c  in DIMACS:
-17330  17331 -17332 -114 -17333 0
-17330  17331 -17332 -114 -17334 0
-17330  17331 -17332 -114 -17335 0

c  0+1 --> 1
c    (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧  p_114) -> (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0)
c  in CNF:
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_2
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_1
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨  b^{57, 3}_0
c  in DIMACS:
 17330  17331  17332 -114 -17333 0
 17330  17331  17332 -114 -17334 0
 17330  17331  17332 -114  17335 0

c  1+1 --> 2
c    (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0 ∧  p_114) -> (-b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0)
c  in CNF:
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_2
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨  b^{57, 3}_1
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ -p_114 ∨ -b^{57, 3}_0
c  in DIMACS:
 17330  17331 -17332 -114 -17333 0
 17330  17331 -17332 -114  17334 0
 17330  17331 -17332 -114 -17335 0

c  2+1 --> break 
c    (-b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧  p_114) -> break
c  in CNF:
c     b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 17330 -17331  17332 -114 1162 0


c  2-1 --> 1
c    (-b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧ -p_114) -> (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0)
c  in CNF:
c     b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_2
c     b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_1
c     b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨  b^{57, 3}_0
c  in DIMACS:
 17330 -17331  17332  114 -17333 0
 17330 -17331  17332  114 -17334 0
 17330 -17331  17332  114  17335 0

c  1-1 --> 0
c    (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0 ∧ -p_114) -> (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧ -b^{57, 3}_0)
c  in CNF:
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_2
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_1
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_0
c  in DIMACS:
 17330  17331 -17332  114 -17333 0
 17330  17331 -17332  114 -17334 0
 17330  17331 -17332  114 -17335 0

c  0-1 --> -1
c    (-b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧ -p_114) -> ( b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0)
c  in CNF:
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨  b^{57, 3}_2
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_1
c     b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨  b^{57, 3}_0
c  in DIMACS:
 17330  17331  17332  114  17333 0
 17330  17331  17332  114 -17334 0
 17330  17331  17332  114  17335 0

c  -1-1 --> -2
c    ( b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧  b^{57, 2}_0 ∧ -p_114) -> ( b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0)
c  in CNF:
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨  b^{57, 3}_2
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨  b^{57, 3}_1
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨  p_114 ∨ -b^{57, 3}_0
c  in DIMACS:
-17330  17331 -17332  114  17333 0
-17330  17331 -17332  114  17334 0
-17330  17331 -17332  114 -17335 0

c  -2-1 --> break 
c    ( b^{57, 2}_2 ∧  b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨  b^{57, 2}_0 ∨  p_114 ∨ break
c  in DIMACS:
-17330 -17331  17332  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 2}_2 ∧ -b^{57, 2}_1 ∧ -b^{57, 2}_0 ∧ true) 
c  in CNF:
c    -b^{57, 2}_2 ∨  b^{57, 2}_1 ∨  b^{57, 2}_0 ∨ false 
c  in DIMACS:
-17330  17331  17332  0

c  3 does not represent an automaton state.
c    -(-b^{57, 2}_2 ∧  b^{57, 2}_1 ∧  b^{57, 2}_0 ∧ true) 
c  in CNF:
c     b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ false 
c  in DIMACS:
 17330 -17331 -17332  0
c  -3 does not represent an automaton state.
c    -( b^{57, 2}_2 ∧  b^{57, 2}_1 ∧  b^{57, 2}_0 ∧ true) 
c  in CNF:
c    -b^{57, 2}_2 ∨ -b^{57, 2}_1 ∨ -b^{57, 2}_0 ∨ false 
c  in DIMACS:
-17330 -17331 -17332  0

c i = 3
c  -2+1 --> -1
c    ( b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧  p_171) -> ( b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0)
c  in CNF:
c    -b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨  b^{57, 4}_2
c    -b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_1
c    -b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨  b^{57, 4}_0
c  in DIMACS:
-17333 -17334  17335 -171  17336 0
-17333 -17334  17335 -171 -17337 0
-17333 -17334  17335 -171  17338 0

c  -1+1 --> 0
c    ( b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0 ∧  p_171) -> (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧ -b^{57, 4}_0)
c  in CNF:
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_2
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_1
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_0
c  in DIMACS:
-17333  17334 -17335 -171 -17336 0
-17333  17334 -17335 -171 -17337 0
-17333  17334 -17335 -171 -17338 0

c  0+1 --> 1
c    (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧  p_171) -> (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0)
c  in CNF:
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_2
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_1
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨  b^{57, 4}_0
c  in DIMACS:
 17333  17334  17335 -171 -17336 0
 17333  17334  17335 -171 -17337 0
 17333  17334  17335 -171  17338 0

c  1+1 --> 2
c    (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0 ∧  p_171) -> (-b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0)
c  in CNF:
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_2
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨  b^{57, 4}_1
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ -p_171 ∨ -b^{57, 4}_0
c  in DIMACS:
 17333  17334 -17335 -171 -17336 0
 17333  17334 -17335 -171  17337 0
 17333  17334 -17335 -171 -17338 0

c  2+1 --> break 
c    (-b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧  p_171) -> break
c  in CNF:
c     b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 17333 -17334  17335 -171 1162 0


c  2-1 --> 1
c    (-b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧ -p_171) -> (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0)
c  in CNF:
c     b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_2
c     b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_1
c     b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨  b^{57, 4}_0
c  in DIMACS:
 17333 -17334  17335  171 -17336 0
 17333 -17334  17335  171 -17337 0
 17333 -17334  17335  171  17338 0

c  1-1 --> 0
c    (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0 ∧ -p_171) -> (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧ -b^{57, 4}_0)
c  in CNF:
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_2
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_1
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_0
c  in DIMACS:
 17333  17334 -17335  171 -17336 0
 17333  17334 -17335  171 -17337 0
 17333  17334 -17335  171 -17338 0

c  0-1 --> -1
c    (-b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧ -p_171) -> ( b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0)
c  in CNF:
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨  b^{57, 4}_2
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_1
c     b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨  b^{57, 4}_0
c  in DIMACS:
 17333  17334  17335  171  17336 0
 17333  17334  17335  171 -17337 0
 17333  17334  17335  171  17338 0

c  -1-1 --> -2
c    ( b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧  b^{57, 3}_0 ∧ -p_171) -> ( b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0)
c  in CNF:
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨  b^{57, 4}_2
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨  b^{57, 4}_1
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨  p_171 ∨ -b^{57, 4}_0
c  in DIMACS:
-17333  17334 -17335  171  17336 0
-17333  17334 -17335  171  17337 0
-17333  17334 -17335  171 -17338 0

c  -2-1 --> break 
c    ( b^{57, 3}_2 ∧  b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨  b^{57, 3}_0 ∨  p_171 ∨ break
c  in DIMACS:
-17333 -17334  17335  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 3}_2 ∧ -b^{57, 3}_1 ∧ -b^{57, 3}_0 ∧ true) 
c  in CNF:
c    -b^{57, 3}_2 ∨  b^{57, 3}_1 ∨  b^{57, 3}_0 ∨ false 
c  in DIMACS:
-17333  17334  17335  0

c  3 does not represent an automaton state.
c    -(-b^{57, 3}_2 ∧  b^{57, 3}_1 ∧  b^{57, 3}_0 ∧ true) 
c  in CNF:
c     b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ false 
c  in DIMACS:
 17333 -17334 -17335  0
c  -3 does not represent an automaton state.
c    -( b^{57, 3}_2 ∧  b^{57, 3}_1 ∧  b^{57, 3}_0 ∧ true) 
c  in CNF:
c    -b^{57, 3}_2 ∨ -b^{57, 3}_1 ∨ -b^{57, 3}_0 ∨ false 
c  in DIMACS:
-17333 -17334 -17335  0

c i = 4
c  -2+1 --> -1
c    ( b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧  p_228) -> ( b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0)
c  in CNF:
c    -b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨  b^{57, 5}_2
c    -b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_1
c    -b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨  b^{57, 5}_0
c  in DIMACS:
-17336 -17337  17338 -228  17339 0
-17336 -17337  17338 -228 -17340 0
-17336 -17337  17338 -228  17341 0

c  -1+1 --> 0
c    ( b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0 ∧  p_228) -> (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧ -b^{57, 5}_0)
c  in CNF:
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_2
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_1
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_0
c  in DIMACS:
-17336  17337 -17338 -228 -17339 0
-17336  17337 -17338 -228 -17340 0
-17336  17337 -17338 -228 -17341 0

c  0+1 --> 1
c    (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧  p_228) -> (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0)
c  in CNF:
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_2
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_1
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨  b^{57, 5}_0
c  in DIMACS:
 17336  17337  17338 -228 -17339 0
 17336  17337  17338 -228 -17340 0
 17336  17337  17338 -228  17341 0

c  1+1 --> 2
c    (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0 ∧  p_228) -> (-b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0)
c  in CNF:
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_2
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨  b^{57, 5}_1
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ -p_228 ∨ -b^{57, 5}_0
c  in DIMACS:
 17336  17337 -17338 -228 -17339 0
 17336  17337 -17338 -228  17340 0
 17336  17337 -17338 -228 -17341 0

c  2+1 --> break 
c    (-b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧  p_228) -> break
c  in CNF:
c     b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 17336 -17337  17338 -228 1162 0


c  2-1 --> 1
c    (-b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧ -p_228) -> (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0)
c  in CNF:
c     b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_2
c     b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_1
c     b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨  b^{57, 5}_0
c  in DIMACS:
 17336 -17337  17338  228 -17339 0
 17336 -17337  17338  228 -17340 0
 17336 -17337  17338  228  17341 0

c  1-1 --> 0
c    (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0 ∧ -p_228) -> (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧ -b^{57, 5}_0)
c  in CNF:
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_2
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_1
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_0
c  in DIMACS:
 17336  17337 -17338  228 -17339 0
 17336  17337 -17338  228 -17340 0
 17336  17337 -17338  228 -17341 0

c  0-1 --> -1
c    (-b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧ -p_228) -> ( b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0)
c  in CNF:
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨  b^{57, 5}_2
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_1
c     b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨  b^{57, 5}_0
c  in DIMACS:
 17336  17337  17338  228  17339 0
 17336  17337  17338  228 -17340 0
 17336  17337  17338  228  17341 0

c  -1-1 --> -2
c    ( b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧  b^{57, 4}_0 ∧ -p_228) -> ( b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0)
c  in CNF:
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨  b^{57, 5}_2
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨  b^{57, 5}_1
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨  p_228 ∨ -b^{57, 5}_0
c  in DIMACS:
-17336  17337 -17338  228  17339 0
-17336  17337 -17338  228  17340 0
-17336  17337 -17338  228 -17341 0

c  -2-1 --> break 
c    ( b^{57, 4}_2 ∧  b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨  b^{57, 4}_0 ∨  p_228 ∨ break
c  in DIMACS:
-17336 -17337  17338  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 4}_2 ∧ -b^{57, 4}_1 ∧ -b^{57, 4}_0 ∧ true) 
c  in CNF:
c    -b^{57, 4}_2 ∨  b^{57, 4}_1 ∨  b^{57, 4}_0 ∨ false 
c  in DIMACS:
-17336  17337  17338  0

c  3 does not represent an automaton state.
c    -(-b^{57, 4}_2 ∧  b^{57, 4}_1 ∧  b^{57, 4}_0 ∧ true) 
c  in CNF:
c     b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ false 
c  in DIMACS:
 17336 -17337 -17338  0
c  -3 does not represent an automaton state.
c    -( b^{57, 4}_2 ∧  b^{57, 4}_1 ∧  b^{57, 4}_0 ∧ true) 
c  in CNF:
c    -b^{57, 4}_2 ∨ -b^{57, 4}_1 ∨ -b^{57, 4}_0 ∨ false 
c  in DIMACS:
-17336 -17337 -17338  0

c i = 5
c  -2+1 --> -1
c    ( b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧  p_285) -> ( b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0)
c  in CNF:
c    -b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨  b^{57, 6}_2
c    -b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_1
c    -b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨  b^{57, 6}_0
c  in DIMACS:
-17339 -17340  17341 -285  17342 0
-17339 -17340  17341 -285 -17343 0
-17339 -17340  17341 -285  17344 0

c  -1+1 --> 0
c    ( b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0 ∧  p_285) -> (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧ -b^{57, 6}_0)
c  in CNF:
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_2
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_1
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_0
c  in DIMACS:
-17339  17340 -17341 -285 -17342 0
-17339  17340 -17341 -285 -17343 0
-17339  17340 -17341 -285 -17344 0

c  0+1 --> 1
c    (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧  p_285) -> (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0)
c  in CNF:
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_2
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_1
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨  b^{57, 6}_0
c  in DIMACS:
 17339  17340  17341 -285 -17342 0
 17339  17340  17341 -285 -17343 0
 17339  17340  17341 -285  17344 0

c  1+1 --> 2
c    (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0 ∧  p_285) -> (-b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0)
c  in CNF:
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_2
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨  b^{57, 6}_1
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ -p_285 ∨ -b^{57, 6}_0
c  in DIMACS:
 17339  17340 -17341 -285 -17342 0
 17339  17340 -17341 -285  17343 0
 17339  17340 -17341 -285 -17344 0

c  2+1 --> break 
c    (-b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧  p_285) -> break
c  in CNF:
c     b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 17339 -17340  17341 -285 1162 0


c  2-1 --> 1
c    (-b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧ -p_285) -> (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0)
c  in CNF:
c     b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_2
c     b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_1
c     b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨  b^{57, 6}_0
c  in DIMACS:
 17339 -17340  17341  285 -17342 0
 17339 -17340  17341  285 -17343 0
 17339 -17340  17341  285  17344 0

c  1-1 --> 0
c    (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0 ∧ -p_285) -> (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧ -b^{57, 6}_0)
c  in CNF:
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_2
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_1
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_0
c  in DIMACS:
 17339  17340 -17341  285 -17342 0
 17339  17340 -17341  285 -17343 0
 17339  17340 -17341  285 -17344 0

c  0-1 --> -1
c    (-b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧ -p_285) -> ( b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0)
c  in CNF:
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨  b^{57, 6}_2
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_1
c     b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨  b^{57, 6}_0
c  in DIMACS:
 17339  17340  17341  285  17342 0
 17339  17340  17341  285 -17343 0
 17339  17340  17341  285  17344 0

c  -1-1 --> -2
c    ( b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧  b^{57, 5}_0 ∧ -p_285) -> ( b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0)
c  in CNF:
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨  b^{57, 6}_2
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨  b^{57, 6}_1
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨  p_285 ∨ -b^{57, 6}_0
c  in DIMACS:
-17339  17340 -17341  285  17342 0
-17339  17340 -17341  285  17343 0
-17339  17340 -17341  285 -17344 0

c  -2-1 --> break 
c    ( b^{57, 5}_2 ∧  b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨  b^{57, 5}_0 ∨  p_285 ∨ break
c  in DIMACS:
-17339 -17340  17341  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 5}_2 ∧ -b^{57, 5}_1 ∧ -b^{57, 5}_0 ∧ true) 
c  in CNF:
c    -b^{57, 5}_2 ∨  b^{57, 5}_1 ∨  b^{57, 5}_0 ∨ false 
c  in DIMACS:
-17339  17340  17341  0

c  3 does not represent an automaton state.
c    -(-b^{57, 5}_2 ∧  b^{57, 5}_1 ∧  b^{57, 5}_0 ∧ true) 
c  in CNF:
c     b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ false 
c  in DIMACS:
 17339 -17340 -17341  0
c  -3 does not represent an automaton state.
c    -( b^{57, 5}_2 ∧  b^{57, 5}_1 ∧  b^{57, 5}_0 ∧ true) 
c  in CNF:
c    -b^{57, 5}_2 ∨ -b^{57, 5}_1 ∨ -b^{57, 5}_0 ∨ false 
c  in DIMACS:
-17339 -17340 -17341  0

c i = 6
c  -2+1 --> -1
c    ( b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧  p_342) -> ( b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0)
c  in CNF:
c    -b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨  b^{57, 7}_2
c    -b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_1
c    -b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨  b^{57, 7}_0
c  in DIMACS:
-17342 -17343  17344 -342  17345 0
-17342 -17343  17344 -342 -17346 0
-17342 -17343  17344 -342  17347 0

c  -1+1 --> 0
c    ( b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0 ∧  p_342) -> (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧ -b^{57, 7}_0)
c  in CNF:
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_2
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_1
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_0
c  in DIMACS:
-17342  17343 -17344 -342 -17345 0
-17342  17343 -17344 -342 -17346 0
-17342  17343 -17344 -342 -17347 0

c  0+1 --> 1
c    (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧  p_342) -> (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0)
c  in CNF:
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_2
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_1
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨  b^{57, 7}_0
c  in DIMACS:
 17342  17343  17344 -342 -17345 0
 17342  17343  17344 -342 -17346 0
 17342  17343  17344 -342  17347 0

c  1+1 --> 2
c    (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0 ∧  p_342) -> (-b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0)
c  in CNF:
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_2
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨  b^{57, 7}_1
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ -p_342 ∨ -b^{57, 7}_0
c  in DIMACS:
 17342  17343 -17344 -342 -17345 0
 17342  17343 -17344 -342  17346 0
 17342  17343 -17344 -342 -17347 0

c  2+1 --> break 
c    (-b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧  p_342) -> break
c  in CNF:
c     b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 17342 -17343  17344 -342 1162 0


c  2-1 --> 1
c    (-b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧ -p_342) -> (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0)
c  in CNF:
c     b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_2
c     b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_1
c     b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨  b^{57, 7}_0
c  in DIMACS:
 17342 -17343  17344  342 -17345 0
 17342 -17343  17344  342 -17346 0
 17342 -17343  17344  342  17347 0

c  1-1 --> 0
c    (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0 ∧ -p_342) -> (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧ -b^{57, 7}_0)
c  in CNF:
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_2
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_1
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_0
c  in DIMACS:
 17342  17343 -17344  342 -17345 0
 17342  17343 -17344  342 -17346 0
 17342  17343 -17344  342 -17347 0

c  0-1 --> -1
c    (-b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧ -p_342) -> ( b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0)
c  in CNF:
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨  b^{57, 7}_2
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_1
c     b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨  b^{57, 7}_0
c  in DIMACS:
 17342  17343  17344  342  17345 0
 17342  17343  17344  342 -17346 0
 17342  17343  17344  342  17347 0

c  -1-1 --> -2
c    ( b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧  b^{57, 6}_0 ∧ -p_342) -> ( b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0)
c  in CNF:
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨  b^{57, 7}_2
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨  b^{57, 7}_1
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨  p_342 ∨ -b^{57, 7}_0
c  in DIMACS:
-17342  17343 -17344  342  17345 0
-17342  17343 -17344  342  17346 0
-17342  17343 -17344  342 -17347 0

c  -2-1 --> break 
c    ( b^{57, 6}_2 ∧  b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨  b^{57, 6}_0 ∨  p_342 ∨ break
c  in DIMACS:
-17342 -17343  17344  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 6}_2 ∧ -b^{57, 6}_1 ∧ -b^{57, 6}_0 ∧ true) 
c  in CNF:
c    -b^{57, 6}_2 ∨  b^{57, 6}_1 ∨  b^{57, 6}_0 ∨ false 
c  in DIMACS:
-17342  17343  17344  0

c  3 does not represent an automaton state.
c    -(-b^{57, 6}_2 ∧  b^{57, 6}_1 ∧  b^{57, 6}_0 ∧ true) 
c  in CNF:
c     b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ false 
c  in DIMACS:
 17342 -17343 -17344  0
c  -3 does not represent an automaton state.
c    -( b^{57, 6}_2 ∧  b^{57, 6}_1 ∧  b^{57, 6}_0 ∧ true) 
c  in CNF:
c    -b^{57, 6}_2 ∨ -b^{57, 6}_1 ∨ -b^{57, 6}_0 ∨ false 
c  in DIMACS:
-17342 -17343 -17344  0

c i = 7
c  -2+1 --> -1
c    ( b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧  p_399) -> ( b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0)
c  in CNF:
c    -b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨  b^{57, 8}_2
c    -b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_1
c    -b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨  b^{57, 8}_0
c  in DIMACS:
-17345 -17346  17347 -399  17348 0
-17345 -17346  17347 -399 -17349 0
-17345 -17346  17347 -399  17350 0

c  -1+1 --> 0
c    ( b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0 ∧  p_399) -> (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧ -b^{57, 8}_0)
c  in CNF:
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_2
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_1
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_0
c  in DIMACS:
-17345  17346 -17347 -399 -17348 0
-17345  17346 -17347 -399 -17349 0
-17345  17346 -17347 -399 -17350 0

c  0+1 --> 1
c    (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧  p_399) -> (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0)
c  in CNF:
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_2
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_1
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨  b^{57, 8}_0
c  in DIMACS:
 17345  17346  17347 -399 -17348 0
 17345  17346  17347 -399 -17349 0
 17345  17346  17347 -399  17350 0

c  1+1 --> 2
c    (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0 ∧  p_399) -> (-b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0)
c  in CNF:
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_2
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨  b^{57, 8}_1
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ -p_399 ∨ -b^{57, 8}_0
c  in DIMACS:
 17345  17346 -17347 -399 -17348 0
 17345  17346 -17347 -399  17349 0
 17345  17346 -17347 -399 -17350 0

c  2+1 --> break 
c    (-b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧  p_399) -> break
c  in CNF:
c     b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 17345 -17346  17347 -399 1162 0


c  2-1 --> 1
c    (-b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧ -p_399) -> (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0)
c  in CNF:
c     b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_2
c     b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_1
c     b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨  b^{57, 8}_0
c  in DIMACS:
 17345 -17346  17347  399 -17348 0
 17345 -17346  17347  399 -17349 0
 17345 -17346  17347  399  17350 0

c  1-1 --> 0
c    (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0 ∧ -p_399) -> (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧ -b^{57, 8}_0)
c  in CNF:
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_2
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_1
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_0
c  in DIMACS:
 17345  17346 -17347  399 -17348 0
 17345  17346 -17347  399 -17349 0
 17345  17346 -17347  399 -17350 0

c  0-1 --> -1
c    (-b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧ -p_399) -> ( b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0)
c  in CNF:
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨  b^{57, 8}_2
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_1
c     b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨  b^{57, 8}_0
c  in DIMACS:
 17345  17346  17347  399  17348 0
 17345  17346  17347  399 -17349 0
 17345  17346  17347  399  17350 0

c  -1-1 --> -2
c    ( b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧  b^{57, 7}_0 ∧ -p_399) -> ( b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0)
c  in CNF:
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨  b^{57, 8}_2
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨  b^{57, 8}_1
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨  p_399 ∨ -b^{57, 8}_0
c  in DIMACS:
-17345  17346 -17347  399  17348 0
-17345  17346 -17347  399  17349 0
-17345  17346 -17347  399 -17350 0

c  -2-1 --> break 
c    ( b^{57, 7}_2 ∧  b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨  b^{57, 7}_0 ∨  p_399 ∨ break
c  in DIMACS:
-17345 -17346  17347  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 7}_2 ∧ -b^{57, 7}_1 ∧ -b^{57, 7}_0 ∧ true) 
c  in CNF:
c    -b^{57, 7}_2 ∨  b^{57, 7}_1 ∨  b^{57, 7}_0 ∨ false 
c  in DIMACS:
-17345  17346  17347  0

c  3 does not represent an automaton state.
c    -(-b^{57, 7}_2 ∧  b^{57, 7}_1 ∧  b^{57, 7}_0 ∧ true) 
c  in CNF:
c     b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ false 
c  in DIMACS:
 17345 -17346 -17347  0
c  -3 does not represent an automaton state.
c    -( b^{57, 7}_2 ∧  b^{57, 7}_1 ∧  b^{57, 7}_0 ∧ true) 
c  in CNF:
c    -b^{57, 7}_2 ∨ -b^{57, 7}_1 ∨ -b^{57, 7}_0 ∨ false 
c  in DIMACS:
-17345 -17346 -17347  0

c i = 8
c  -2+1 --> -1
c    ( b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧  p_456) -> ( b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0)
c  in CNF:
c    -b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨  b^{57, 9}_2
c    -b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_1
c    -b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨  b^{57, 9}_0
c  in DIMACS:
-17348 -17349  17350 -456  17351 0
-17348 -17349  17350 -456 -17352 0
-17348 -17349  17350 -456  17353 0

c  -1+1 --> 0
c    ( b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0 ∧  p_456) -> (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧ -b^{57, 9}_0)
c  in CNF:
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_2
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_1
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_0
c  in DIMACS:
-17348  17349 -17350 -456 -17351 0
-17348  17349 -17350 -456 -17352 0
-17348  17349 -17350 -456 -17353 0

c  0+1 --> 1
c    (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧  p_456) -> (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0)
c  in CNF:
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_2
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_1
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨  b^{57, 9}_0
c  in DIMACS:
 17348  17349  17350 -456 -17351 0
 17348  17349  17350 -456 -17352 0
 17348  17349  17350 -456  17353 0

c  1+1 --> 2
c    (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0 ∧  p_456) -> (-b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0)
c  in CNF:
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_2
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨  b^{57, 9}_1
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ -p_456 ∨ -b^{57, 9}_0
c  in DIMACS:
 17348  17349 -17350 -456 -17351 0
 17348  17349 -17350 -456  17352 0
 17348  17349 -17350 -456 -17353 0

c  2+1 --> break 
c    (-b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧  p_456) -> break
c  in CNF:
c     b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 17348 -17349  17350 -456 1162 0


c  2-1 --> 1
c    (-b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧ -p_456) -> (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0)
c  in CNF:
c     b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_2
c     b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_1
c     b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨  b^{57, 9}_0
c  in DIMACS:
 17348 -17349  17350  456 -17351 0
 17348 -17349  17350  456 -17352 0
 17348 -17349  17350  456  17353 0

c  1-1 --> 0
c    (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0 ∧ -p_456) -> (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧ -b^{57, 9}_0)
c  in CNF:
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_2
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_1
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_0
c  in DIMACS:
 17348  17349 -17350  456 -17351 0
 17348  17349 -17350  456 -17352 0
 17348  17349 -17350  456 -17353 0

c  0-1 --> -1
c    (-b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧ -p_456) -> ( b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0)
c  in CNF:
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨  b^{57, 9}_2
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_1
c     b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨  b^{57, 9}_0
c  in DIMACS:
 17348  17349  17350  456  17351 0
 17348  17349  17350  456 -17352 0
 17348  17349  17350  456  17353 0

c  -1-1 --> -2
c    ( b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧  b^{57, 8}_0 ∧ -p_456) -> ( b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0)
c  in CNF:
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨  b^{57, 9}_2
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨  b^{57, 9}_1
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨  p_456 ∨ -b^{57, 9}_0
c  in DIMACS:
-17348  17349 -17350  456  17351 0
-17348  17349 -17350  456  17352 0
-17348  17349 -17350  456 -17353 0

c  -2-1 --> break 
c    ( b^{57, 8}_2 ∧  b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨  b^{57, 8}_0 ∨  p_456 ∨ break
c  in DIMACS:
-17348 -17349  17350  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 8}_2 ∧ -b^{57, 8}_1 ∧ -b^{57, 8}_0 ∧ true) 
c  in CNF:
c    -b^{57, 8}_2 ∨  b^{57, 8}_1 ∨  b^{57, 8}_0 ∨ false 
c  in DIMACS:
-17348  17349  17350  0

c  3 does not represent an automaton state.
c    -(-b^{57, 8}_2 ∧  b^{57, 8}_1 ∧  b^{57, 8}_0 ∧ true) 
c  in CNF:
c     b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ false 
c  in DIMACS:
 17348 -17349 -17350  0
c  -3 does not represent an automaton state.
c    -( b^{57, 8}_2 ∧  b^{57, 8}_1 ∧  b^{57, 8}_0 ∧ true) 
c  in CNF:
c    -b^{57, 8}_2 ∨ -b^{57, 8}_1 ∨ -b^{57, 8}_0 ∨ false 
c  in DIMACS:
-17348 -17349 -17350  0

c i = 9
c  -2+1 --> -1
c    ( b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧  p_513) -> ( b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0)
c  in CNF:
c    -b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨  b^{57, 10}_2
c    -b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_1
c    -b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨  b^{57, 10}_0
c  in DIMACS:
-17351 -17352  17353 -513  17354 0
-17351 -17352  17353 -513 -17355 0
-17351 -17352  17353 -513  17356 0

c  -1+1 --> 0
c    ( b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0 ∧  p_513) -> (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧ -b^{57, 10}_0)
c  in CNF:
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_2
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_1
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_0
c  in DIMACS:
-17351  17352 -17353 -513 -17354 0
-17351  17352 -17353 -513 -17355 0
-17351  17352 -17353 -513 -17356 0

c  0+1 --> 1
c    (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧  p_513) -> (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0)
c  in CNF:
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_2
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_1
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨  b^{57, 10}_0
c  in DIMACS:
 17351  17352  17353 -513 -17354 0
 17351  17352  17353 -513 -17355 0
 17351  17352  17353 -513  17356 0

c  1+1 --> 2
c    (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0 ∧  p_513) -> (-b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0)
c  in CNF:
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_2
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨  b^{57, 10}_1
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ -p_513 ∨ -b^{57, 10}_0
c  in DIMACS:
 17351  17352 -17353 -513 -17354 0
 17351  17352 -17353 -513  17355 0
 17351  17352 -17353 -513 -17356 0

c  2+1 --> break 
c    (-b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧  p_513) -> break
c  in CNF:
c     b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 17351 -17352  17353 -513 1162 0


c  2-1 --> 1
c    (-b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧ -p_513) -> (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0)
c  in CNF:
c     b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_2
c     b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_1
c     b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨  b^{57, 10}_0
c  in DIMACS:
 17351 -17352  17353  513 -17354 0
 17351 -17352  17353  513 -17355 0
 17351 -17352  17353  513  17356 0

c  1-1 --> 0
c    (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0 ∧ -p_513) -> (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧ -b^{57, 10}_0)
c  in CNF:
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_2
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_1
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_0
c  in DIMACS:
 17351  17352 -17353  513 -17354 0
 17351  17352 -17353  513 -17355 0
 17351  17352 -17353  513 -17356 0

c  0-1 --> -1
c    (-b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧ -p_513) -> ( b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0)
c  in CNF:
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨  b^{57, 10}_2
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_1
c     b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨  b^{57, 10}_0
c  in DIMACS:
 17351  17352  17353  513  17354 0
 17351  17352  17353  513 -17355 0
 17351  17352  17353  513  17356 0

c  -1-1 --> -2
c    ( b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧  b^{57, 9}_0 ∧ -p_513) -> ( b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0)
c  in CNF:
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨  b^{57, 10}_2
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨  b^{57, 10}_1
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨  p_513 ∨ -b^{57, 10}_0
c  in DIMACS:
-17351  17352 -17353  513  17354 0
-17351  17352 -17353  513  17355 0
-17351  17352 -17353  513 -17356 0

c  -2-1 --> break 
c    ( b^{57, 9}_2 ∧  b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨  b^{57, 9}_0 ∨  p_513 ∨ break
c  in DIMACS:
-17351 -17352  17353  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 9}_2 ∧ -b^{57, 9}_1 ∧ -b^{57, 9}_0 ∧ true) 
c  in CNF:
c    -b^{57, 9}_2 ∨  b^{57, 9}_1 ∨  b^{57, 9}_0 ∨ false 
c  in DIMACS:
-17351  17352  17353  0

c  3 does not represent an automaton state.
c    -(-b^{57, 9}_2 ∧  b^{57, 9}_1 ∧  b^{57, 9}_0 ∧ true) 
c  in CNF:
c     b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ false 
c  in DIMACS:
 17351 -17352 -17353  0
c  -3 does not represent an automaton state.
c    -( b^{57, 9}_2 ∧  b^{57, 9}_1 ∧  b^{57, 9}_0 ∧ true) 
c  in CNF:
c    -b^{57, 9}_2 ∨ -b^{57, 9}_1 ∨ -b^{57, 9}_0 ∨ false 
c  in DIMACS:
-17351 -17352 -17353  0

c i = 10
c  -2+1 --> -1
c    ( b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧  p_570) -> ( b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0)
c  in CNF:
c    -b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨  b^{57, 11}_2
c    -b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_1
c    -b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨  b^{57, 11}_0
c  in DIMACS:
-17354 -17355  17356 -570  17357 0
-17354 -17355  17356 -570 -17358 0
-17354 -17355  17356 -570  17359 0

c  -1+1 --> 0
c    ( b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0 ∧  p_570) -> (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧ -b^{57, 11}_0)
c  in CNF:
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_2
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_1
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_0
c  in DIMACS:
-17354  17355 -17356 -570 -17357 0
-17354  17355 -17356 -570 -17358 0
-17354  17355 -17356 -570 -17359 0

c  0+1 --> 1
c    (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧  p_570) -> (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0)
c  in CNF:
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_2
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_1
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨  b^{57, 11}_0
c  in DIMACS:
 17354  17355  17356 -570 -17357 0
 17354  17355  17356 -570 -17358 0
 17354  17355  17356 -570  17359 0

c  1+1 --> 2
c    (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0 ∧  p_570) -> (-b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0)
c  in CNF:
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_2
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨  b^{57, 11}_1
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ -p_570 ∨ -b^{57, 11}_0
c  in DIMACS:
 17354  17355 -17356 -570 -17357 0
 17354  17355 -17356 -570  17358 0
 17354  17355 -17356 -570 -17359 0

c  2+1 --> break 
c    (-b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧  p_570) -> break
c  in CNF:
c     b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 17354 -17355  17356 -570 1162 0


c  2-1 --> 1
c    (-b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧ -p_570) -> (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0)
c  in CNF:
c     b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_2
c     b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_1
c     b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨  b^{57, 11}_0
c  in DIMACS:
 17354 -17355  17356  570 -17357 0
 17354 -17355  17356  570 -17358 0
 17354 -17355  17356  570  17359 0

c  1-1 --> 0
c    (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0 ∧ -p_570) -> (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧ -b^{57, 11}_0)
c  in CNF:
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_2
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_1
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_0
c  in DIMACS:
 17354  17355 -17356  570 -17357 0
 17354  17355 -17356  570 -17358 0
 17354  17355 -17356  570 -17359 0

c  0-1 --> -1
c    (-b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧ -p_570) -> ( b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0)
c  in CNF:
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨  b^{57, 11}_2
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_1
c     b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨  b^{57, 11}_0
c  in DIMACS:
 17354  17355  17356  570  17357 0
 17354  17355  17356  570 -17358 0
 17354  17355  17356  570  17359 0

c  -1-1 --> -2
c    ( b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧  b^{57, 10}_0 ∧ -p_570) -> ( b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0)
c  in CNF:
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨  b^{57, 11}_2
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨  b^{57, 11}_1
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨  p_570 ∨ -b^{57, 11}_0
c  in DIMACS:
-17354  17355 -17356  570  17357 0
-17354  17355 -17356  570  17358 0
-17354  17355 -17356  570 -17359 0

c  -2-1 --> break 
c    ( b^{57, 10}_2 ∧  b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨  b^{57, 10}_0 ∨  p_570 ∨ break
c  in DIMACS:
-17354 -17355  17356  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 10}_2 ∧ -b^{57, 10}_1 ∧ -b^{57, 10}_0 ∧ true) 
c  in CNF:
c    -b^{57, 10}_2 ∨  b^{57, 10}_1 ∨  b^{57, 10}_0 ∨ false 
c  in DIMACS:
-17354  17355  17356  0

c  3 does not represent an automaton state.
c    -(-b^{57, 10}_2 ∧  b^{57, 10}_1 ∧  b^{57, 10}_0 ∧ true) 
c  in CNF:
c     b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ false 
c  in DIMACS:
 17354 -17355 -17356  0
c  -3 does not represent an automaton state.
c    -( b^{57, 10}_2 ∧  b^{57, 10}_1 ∧  b^{57, 10}_0 ∧ true) 
c  in CNF:
c    -b^{57, 10}_2 ∨ -b^{57, 10}_1 ∨ -b^{57, 10}_0 ∨ false 
c  in DIMACS:
-17354 -17355 -17356  0

c i = 11
c  -2+1 --> -1
c    ( b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧  p_627) -> ( b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0)
c  in CNF:
c    -b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨  b^{57, 12}_2
c    -b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_1
c    -b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨  b^{57, 12}_0
c  in DIMACS:
-17357 -17358  17359 -627  17360 0
-17357 -17358  17359 -627 -17361 0
-17357 -17358  17359 -627  17362 0

c  -1+1 --> 0
c    ( b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0 ∧  p_627) -> (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧ -b^{57, 12}_0)
c  in CNF:
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_2
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_1
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_0
c  in DIMACS:
-17357  17358 -17359 -627 -17360 0
-17357  17358 -17359 -627 -17361 0
-17357  17358 -17359 -627 -17362 0

c  0+1 --> 1
c    (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧  p_627) -> (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0)
c  in CNF:
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_2
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_1
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨  b^{57, 12}_0
c  in DIMACS:
 17357  17358  17359 -627 -17360 0
 17357  17358  17359 -627 -17361 0
 17357  17358  17359 -627  17362 0

c  1+1 --> 2
c    (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0 ∧  p_627) -> (-b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0)
c  in CNF:
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_2
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨  b^{57, 12}_1
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ -p_627 ∨ -b^{57, 12}_0
c  in DIMACS:
 17357  17358 -17359 -627 -17360 0
 17357  17358 -17359 -627  17361 0
 17357  17358 -17359 -627 -17362 0

c  2+1 --> break 
c    (-b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧  p_627) -> break
c  in CNF:
c     b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 17357 -17358  17359 -627 1162 0


c  2-1 --> 1
c    (-b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧ -p_627) -> (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0)
c  in CNF:
c     b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_2
c     b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_1
c     b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨  b^{57, 12}_0
c  in DIMACS:
 17357 -17358  17359  627 -17360 0
 17357 -17358  17359  627 -17361 0
 17357 -17358  17359  627  17362 0

c  1-1 --> 0
c    (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0 ∧ -p_627) -> (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧ -b^{57, 12}_0)
c  in CNF:
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_2
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_1
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_0
c  in DIMACS:
 17357  17358 -17359  627 -17360 0
 17357  17358 -17359  627 -17361 0
 17357  17358 -17359  627 -17362 0

c  0-1 --> -1
c    (-b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧ -p_627) -> ( b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0)
c  in CNF:
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨  b^{57, 12}_2
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_1
c     b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨  b^{57, 12}_0
c  in DIMACS:
 17357  17358  17359  627  17360 0
 17357  17358  17359  627 -17361 0
 17357  17358  17359  627  17362 0

c  -1-1 --> -2
c    ( b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧  b^{57, 11}_0 ∧ -p_627) -> ( b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0)
c  in CNF:
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨  b^{57, 12}_2
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨  b^{57, 12}_1
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨  p_627 ∨ -b^{57, 12}_0
c  in DIMACS:
-17357  17358 -17359  627  17360 0
-17357  17358 -17359  627  17361 0
-17357  17358 -17359  627 -17362 0

c  -2-1 --> break 
c    ( b^{57, 11}_2 ∧  b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨  b^{57, 11}_0 ∨  p_627 ∨ break
c  in DIMACS:
-17357 -17358  17359  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 11}_2 ∧ -b^{57, 11}_1 ∧ -b^{57, 11}_0 ∧ true) 
c  in CNF:
c    -b^{57, 11}_2 ∨  b^{57, 11}_1 ∨  b^{57, 11}_0 ∨ false 
c  in DIMACS:
-17357  17358  17359  0

c  3 does not represent an automaton state.
c    -(-b^{57, 11}_2 ∧  b^{57, 11}_1 ∧  b^{57, 11}_0 ∧ true) 
c  in CNF:
c     b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ false 
c  in DIMACS:
 17357 -17358 -17359  0
c  -3 does not represent an automaton state.
c    -( b^{57, 11}_2 ∧  b^{57, 11}_1 ∧  b^{57, 11}_0 ∧ true) 
c  in CNF:
c    -b^{57, 11}_2 ∨ -b^{57, 11}_1 ∨ -b^{57, 11}_0 ∨ false 
c  in DIMACS:
-17357 -17358 -17359  0

c i = 12
c  -2+1 --> -1
c    ( b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧  p_684) -> ( b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0)
c  in CNF:
c    -b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨  b^{57, 13}_2
c    -b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_1
c    -b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨  b^{57, 13}_0
c  in DIMACS:
-17360 -17361  17362 -684  17363 0
-17360 -17361  17362 -684 -17364 0
-17360 -17361  17362 -684  17365 0

c  -1+1 --> 0
c    ( b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0 ∧  p_684) -> (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧ -b^{57, 13}_0)
c  in CNF:
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_2
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_1
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_0
c  in DIMACS:
-17360  17361 -17362 -684 -17363 0
-17360  17361 -17362 -684 -17364 0
-17360  17361 -17362 -684 -17365 0

c  0+1 --> 1
c    (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧  p_684) -> (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0)
c  in CNF:
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_2
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_1
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨  b^{57, 13}_0
c  in DIMACS:
 17360  17361  17362 -684 -17363 0
 17360  17361  17362 -684 -17364 0
 17360  17361  17362 -684  17365 0

c  1+1 --> 2
c    (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0 ∧  p_684) -> (-b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0)
c  in CNF:
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_2
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨  b^{57, 13}_1
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ -p_684 ∨ -b^{57, 13}_0
c  in DIMACS:
 17360  17361 -17362 -684 -17363 0
 17360  17361 -17362 -684  17364 0
 17360  17361 -17362 -684 -17365 0

c  2+1 --> break 
c    (-b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧  p_684) -> break
c  in CNF:
c     b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 17360 -17361  17362 -684 1162 0


c  2-1 --> 1
c    (-b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧ -p_684) -> (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0)
c  in CNF:
c     b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_2
c     b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_1
c     b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨  b^{57, 13}_0
c  in DIMACS:
 17360 -17361  17362  684 -17363 0
 17360 -17361  17362  684 -17364 0
 17360 -17361  17362  684  17365 0

c  1-1 --> 0
c    (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0 ∧ -p_684) -> (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧ -b^{57, 13}_0)
c  in CNF:
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_2
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_1
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_0
c  in DIMACS:
 17360  17361 -17362  684 -17363 0
 17360  17361 -17362  684 -17364 0
 17360  17361 -17362  684 -17365 0

c  0-1 --> -1
c    (-b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧ -p_684) -> ( b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0)
c  in CNF:
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨  b^{57, 13}_2
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_1
c     b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨  b^{57, 13}_0
c  in DIMACS:
 17360  17361  17362  684  17363 0
 17360  17361  17362  684 -17364 0
 17360  17361  17362  684  17365 0

c  -1-1 --> -2
c    ( b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧  b^{57, 12}_0 ∧ -p_684) -> ( b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0)
c  in CNF:
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨  b^{57, 13}_2
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨  b^{57, 13}_1
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨  p_684 ∨ -b^{57, 13}_0
c  in DIMACS:
-17360  17361 -17362  684  17363 0
-17360  17361 -17362  684  17364 0
-17360  17361 -17362  684 -17365 0

c  -2-1 --> break 
c    ( b^{57, 12}_2 ∧  b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨  b^{57, 12}_0 ∨  p_684 ∨ break
c  in DIMACS:
-17360 -17361  17362  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 12}_2 ∧ -b^{57, 12}_1 ∧ -b^{57, 12}_0 ∧ true) 
c  in CNF:
c    -b^{57, 12}_2 ∨  b^{57, 12}_1 ∨  b^{57, 12}_0 ∨ false 
c  in DIMACS:
-17360  17361  17362  0

c  3 does not represent an automaton state.
c    -(-b^{57, 12}_2 ∧  b^{57, 12}_1 ∧  b^{57, 12}_0 ∧ true) 
c  in CNF:
c     b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ false 
c  in DIMACS:
 17360 -17361 -17362  0
c  -3 does not represent an automaton state.
c    -( b^{57, 12}_2 ∧  b^{57, 12}_1 ∧  b^{57, 12}_0 ∧ true) 
c  in CNF:
c    -b^{57, 12}_2 ∨ -b^{57, 12}_1 ∨ -b^{57, 12}_0 ∨ false 
c  in DIMACS:
-17360 -17361 -17362  0

c i = 13
c  -2+1 --> -1
c    ( b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧  p_741) -> ( b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0)
c  in CNF:
c    -b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨  b^{57, 14}_2
c    -b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_1
c    -b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨  b^{57, 14}_0
c  in DIMACS:
-17363 -17364  17365 -741  17366 0
-17363 -17364  17365 -741 -17367 0
-17363 -17364  17365 -741  17368 0

c  -1+1 --> 0
c    ( b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0 ∧  p_741) -> (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧ -b^{57, 14}_0)
c  in CNF:
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_2
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_1
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_0
c  in DIMACS:
-17363  17364 -17365 -741 -17366 0
-17363  17364 -17365 -741 -17367 0
-17363  17364 -17365 -741 -17368 0

c  0+1 --> 1
c    (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧  p_741) -> (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0)
c  in CNF:
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_2
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_1
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨  b^{57, 14}_0
c  in DIMACS:
 17363  17364  17365 -741 -17366 0
 17363  17364  17365 -741 -17367 0
 17363  17364  17365 -741  17368 0

c  1+1 --> 2
c    (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0 ∧  p_741) -> (-b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0)
c  in CNF:
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_2
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨  b^{57, 14}_1
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ -p_741 ∨ -b^{57, 14}_0
c  in DIMACS:
 17363  17364 -17365 -741 -17366 0
 17363  17364 -17365 -741  17367 0
 17363  17364 -17365 -741 -17368 0

c  2+1 --> break 
c    (-b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧  p_741) -> break
c  in CNF:
c     b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 17363 -17364  17365 -741 1162 0


c  2-1 --> 1
c    (-b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧ -p_741) -> (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0)
c  in CNF:
c     b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_2
c     b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_1
c     b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨  b^{57, 14}_0
c  in DIMACS:
 17363 -17364  17365  741 -17366 0
 17363 -17364  17365  741 -17367 0
 17363 -17364  17365  741  17368 0

c  1-1 --> 0
c    (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0 ∧ -p_741) -> (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧ -b^{57, 14}_0)
c  in CNF:
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_2
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_1
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_0
c  in DIMACS:
 17363  17364 -17365  741 -17366 0
 17363  17364 -17365  741 -17367 0
 17363  17364 -17365  741 -17368 0

c  0-1 --> -1
c    (-b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧ -p_741) -> ( b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0)
c  in CNF:
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨  b^{57, 14}_2
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_1
c     b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨  b^{57, 14}_0
c  in DIMACS:
 17363  17364  17365  741  17366 0
 17363  17364  17365  741 -17367 0
 17363  17364  17365  741  17368 0

c  -1-1 --> -2
c    ( b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧  b^{57, 13}_0 ∧ -p_741) -> ( b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0)
c  in CNF:
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨  b^{57, 14}_2
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨  b^{57, 14}_1
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨  p_741 ∨ -b^{57, 14}_0
c  in DIMACS:
-17363  17364 -17365  741  17366 0
-17363  17364 -17365  741  17367 0
-17363  17364 -17365  741 -17368 0

c  -2-1 --> break 
c    ( b^{57, 13}_2 ∧  b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨  b^{57, 13}_0 ∨  p_741 ∨ break
c  in DIMACS:
-17363 -17364  17365  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 13}_2 ∧ -b^{57, 13}_1 ∧ -b^{57, 13}_0 ∧ true) 
c  in CNF:
c    -b^{57, 13}_2 ∨  b^{57, 13}_1 ∨  b^{57, 13}_0 ∨ false 
c  in DIMACS:
-17363  17364  17365  0

c  3 does not represent an automaton state.
c    -(-b^{57, 13}_2 ∧  b^{57, 13}_1 ∧  b^{57, 13}_0 ∧ true) 
c  in CNF:
c     b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ false 
c  in DIMACS:
 17363 -17364 -17365  0
c  -3 does not represent an automaton state.
c    -( b^{57, 13}_2 ∧  b^{57, 13}_1 ∧  b^{57, 13}_0 ∧ true) 
c  in CNF:
c    -b^{57, 13}_2 ∨ -b^{57, 13}_1 ∨ -b^{57, 13}_0 ∨ false 
c  in DIMACS:
-17363 -17364 -17365  0

c i = 14
c  -2+1 --> -1
c    ( b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧  p_798) -> ( b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0)
c  in CNF:
c    -b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨  b^{57, 15}_2
c    -b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_1
c    -b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨  b^{57, 15}_0
c  in DIMACS:
-17366 -17367  17368 -798  17369 0
-17366 -17367  17368 -798 -17370 0
-17366 -17367  17368 -798  17371 0

c  -1+1 --> 0
c    ( b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0 ∧  p_798) -> (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧ -b^{57, 15}_0)
c  in CNF:
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_2
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_1
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_0
c  in DIMACS:
-17366  17367 -17368 -798 -17369 0
-17366  17367 -17368 -798 -17370 0
-17366  17367 -17368 -798 -17371 0

c  0+1 --> 1
c    (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧  p_798) -> (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0)
c  in CNF:
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_2
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_1
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨  b^{57, 15}_0
c  in DIMACS:
 17366  17367  17368 -798 -17369 0
 17366  17367  17368 -798 -17370 0
 17366  17367  17368 -798  17371 0

c  1+1 --> 2
c    (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0 ∧  p_798) -> (-b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0)
c  in CNF:
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_2
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨  b^{57, 15}_1
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ -p_798 ∨ -b^{57, 15}_0
c  in DIMACS:
 17366  17367 -17368 -798 -17369 0
 17366  17367 -17368 -798  17370 0
 17366  17367 -17368 -798 -17371 0

c  2+1 --> break 
c    (-b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧  p_798) -> break
c  in CNF:
c     b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 17366 -17367  17368 -798 1162 0


c  2-1 --> 1
c    (-b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧ -p_798) -> (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0)
c  in CNF:
c     b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_2
c     b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_1
c     b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨  b^{57, 15}_0
c  in DIMACS:
 17366 -17367  17368  798 -17369 0
 17366 -17367  17368  798 -17370 0
 17366 -17367  17368  798  17371 0

c  1-1 --> 0
c    (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0 ∧ -p_798) -> (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧ -b^{57, 15}_0)
c  in CNF:
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_2
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_1
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_0
c  in DIMACS:
 17366  17367 -17368  798 -17369 0
 17366  17367 -17368  798 -17370 0
 17366  17367 -17368  798 -17371 0

c  0-1 --> -1
c    (-b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧ -p_798) -> ( b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0)
c  in CNF:
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨  b^{57, 15}_2
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_1
c     b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨  b^{57, 15}_0
c  in DIMACS:
 17366  17367  17368  798  17369 0
 17366  17367  17368  798 -17370 0
 17366  17367  17368  798  17371 0

c  -1-1 --> -2
c    ( b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧  b^{57, 14}_0 ∧ -p_798) -> ( b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0)
c  in CNF:
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨  b^{57, 15}_2
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨  b^{57, 15}_1
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨  p_798 ∨ -b^{57, 15}_0
c  in DIMACS:
-17366  17367 -17368  798  17369 0
-17366  17367 -17368  798  17370 0
-17366  17367 -17368  798 -17371 0

c  -2-1 --> break 
c    ( b^{57, 14}_2 ∧  b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨  b^{57, 14}_0 ∨  p_798 ∨ break
c  in DIMACS:
-17366 -17367  17368  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 14}_2 ∧ -b^{57, 14}_1 ∧ -b^{57, 14}_0 ∧ true) 
c  in CNF:
c    -b^{57, 14}_2 ∨  b^{57, 14}_1 ∨  b^{57, 14}_0 ∨ false 
c  in DIMACS:
-17366  17367  17368  0

c  3 does not represent an automaton state.
c    -(-b^{57, 14}_2 ∧  b^{57, 14}_1 ∧  b^{57, 14}_0 ∧ true) 
c  in CNF:
c     b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ false 
c  in DIMACS:
 17366 -17367 -17368  0
c  -3 does not represent an automaton state.
c    -( b^{57, 14}_2 ∧  b^{57, 14}_1 ∧  b^{57, 14}_0 ∧ true) 
c  in CNF:
c    -b^{57, 14}_2 ∨ -b^{57, 14}_1 ∨ -b^{57, 14}_0 ∨ false 
c  in DIMACS:
-17366 -17367 -17368  0

c i = 15
c  -2+1 --> -1
c    ( b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧  p_855) -> ( b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0)
c  in CNF:
c    -b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨  b^{57, 16}_2
c    -b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_1
c    -b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨  b^{57, 16}_0
c  in DIMACS:
-17369 -17370  17371 -855  17372 0
-17369 -17370  17371 -855 -17373 0
-17369 -17370  17371 -855  17374 0

c  -1+1 --> 0
c    ( b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0 ∧  p_855) -> (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧ -b^{57, 16}_0)
c  in CNF:
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_2
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_1
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_0
c  in DIMACS:
-17369  17370 -17371 -855 -17372 0
-17369  17370 -17371 -855 -17373 0
-17369  17370 -17371 -855 -17374 0

c  0+1 --> 1
c    (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧  p_855) -> (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0)
c  in CNF:
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_2
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_1
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨  b^{57, 16}_0
c  in DIMACS:
 17369  17370  17371 -855 -17372 0
 17369  17370  17371 -855 -17373 0
 17369  17370  17371 -855  17374 0

c  1+1 --> 2
c    (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0 ∧  p_855) -> (-b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0)
c  in CNF:
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_2
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨  b^{57, 16}_1
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ -p_855 ∨ -b^{57, 16}_0
c  in DIMACS:
 17369  17370 -17371 -855 -17372 0
 17369  17370 -17371 -855  17373 0
 17369  17370 -17371 -855 -17374 0

c  2+1 --> break 
c    (-b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧  p_855) -> break
c  in CNF:
c     b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 17369 -17370  17371 -855 1162 0


c  2-1 --> 1
c    (-b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧ -p_855) -> (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0)
c  in CNF:
c     b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_2
c     b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_1
c     b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨  b^{57, 16}_0
c  in DIMACS:
 17369 -17370  17371  855 -17372 0
 17369 -17370  17371  855 -17373 0
 17369 -17370  17371  855  17374 0

c  1-1 --> 0
c    (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0 ∧ -p_855) -> (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧ -b^{57, 16}_0)
c  in CNF:
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_2
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_1
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_0
c  in DIMACS:
 17369  17370 -17371  855 -17372 0
 17369  17370 -17371  855 -17373 0
 17369  17370 -17371  855 -17374 0

c  0-1 --> -1
c    (-b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧ -p_855) -> ( b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0)
c  in CNF:
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨  b^{57, 16}_2
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_1
c     b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨  b^{57, 16}_0
c  in DIMACS:
 17369  17370  17371  855  17372 0
 17369  17370  17371  855 -17373 0
 17369  17370  17371  855  17374 0

c  -1-1 --> -2
c    ( b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧  b^{57, 15}_0 ∧ -p_855) -> ( b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0)
c  in CNF:
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨  b^{57, 16}_2
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨  b^{57, 16}_1
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨  p_855 ∨ -b^{57, 16}_0
c  in DIMACS:
-17369  17370 -17371  855  17372 0
-17369  17370 -17371  855  17373 0
-17369  17370 -17371  855 -17374 0

c  -2-1 --> break 
c    ( b^{57, 15}_2 ∧  b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨  b^{57, 15}_0 ∨  p_855 ∨ break
c  in DIMACS:
-17369 -17370  17371  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 15}_2 ∧ -b^{57, 15}_1 ∧ -b^{57, 15}_0 ∧ true) 
c  in CNF:
c    -b^{57, 15}_2 ∨  b^{57, 15}_1 ∨  b^{57, 15}_0 ∨ false 
c  in DIMACS:
-17369  17370  17371  0

c  3 does not represent an automaton state.
c    -(-b^{57, 15}_2 ∧  b^{57, 15}_1 ∧  b^{57, 15}_0 ∧ true) 
c  in CNF:
c     b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ false 
c  in DIMACS:
 17369 -17370 -17371  0
c  -3 does not represent an automaton state.
c    -( b^{57, 15}_2 ∧  b^{57, 15}_1 ∧  b^{57, 15}_0 ∧ true) 
c  in CNF:
c    -b^{57, 15}_2 ∨ -b^{57, 15}_1 ∨ -b^{57, 15}_0 ∨ false 
c  in DIMACS:
-17369 -17370 -17371  0

c i = 16
c  -2+1 --> -1
c    ( b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧  p_912) -> ( b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0)
c  in CNF:
c    -b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨  b^{57, 17}_2
c    -b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_1
c    -b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨  b^{57, 17}_0
c  in DIMACS:
-17372 -17373  17374 -912  17375 0
-17372 -17373  17374 -912 -17376 0
-17372 -17373  17374 -912  17377 0

c  -1+1 --> 0
c    ( b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0 ∧  p_912) -> (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧ -b^{57, 17}_0)
c  in CNF:
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_2
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_1
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_0
c  in DIMACS:
-17372  17373 -17374 -912 -17375 0
-17372  17373 -17374 -912 -17376 0
-17372  17373 -17374 -912 -17377 0

c  0+1 --> 1
c    (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧  p_912) -> (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0)
c  in CNF:
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_2
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_1
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨  b^{57, 17}_0
c  in DIMACS:
 17372  17373  17374 -912 -17375 0
 17372  17373  17374 -912 -17376 0
 17372  17373  17374 -912  17377 0

c  1+1 --> 2
c    (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0 ∧  p_912) -> (-b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0)
c  in CNF:
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_2
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨  b^{57, 17}_1
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ -p_912 ∨ -b^{57, 17}_0
c  in DIMACS:
 17372  17373 -17374 -912 -17375 0
 17372  17373 -17374 -912  17376 0
 17372  17373 -17374 -912 -17377 0

c  2+1 --> break 
c    (-b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧  p_912) -> break
c  in CNF:
c     b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 17372 -17373  17374 -912 1162 0


c  2-1 --> 1
c    (-b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧ -p_912) -> (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0)
c  in CNF:
c     b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_2
c     b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_1
c     b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨  b^{57, 17}_0
c  in DIMACS:
 17372 -17373  17374  912 -17375 0
 17372 -17373  17374  912 -17376 0
 17372 -17373  17374  912  17377 0

c  1-1 --> 0
c    (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0 ∧ -p_912) -> (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧ -b^{57, 17}_0)
c  in CNF:
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_2
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_1
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_0
c  in DIMACS:
 17372  17373 -17374  912 -17375 0
 17372  17373 -17374  912 -17376 0
 17372  17373 -17374  912 -17377 0

c  0-1 --> -1
c    (-b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧ -p_912) -> ( b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0)
c  in CNF:
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨  b^{57, 17}_2
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_1
c     b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨  b^{57, 17}_0
c  in DIMACS:
 17372  17373  17374  912  17375 0
 17372  17373  17374  912 -17376 0
 17372  17373  17374  912  17377 0

c  -1-1 --> -2
c    ( b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧  b^{57, 16}_0 ∧ -p_912) -> ( b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0)
c  in CNF:
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨  b^{57, 17}_2
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨  b^{57, 17}_1
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨  p_912 ∨ -b^{57, 17}_0
c  in DIMACS:
-17372  17373 -17374  912  17375 0
-17372  17373 -17374  912  17376 0
-17372  17373 -17374  912 -17377 0

c  -2-1 --> break 
c    ( b^{57, 16}_2 ∧  b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨  b^{57, 16}_0 ∨  p_912 ∨ break
c  in DIMACS:
-17372 -17373  17374  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 16}_2 ∧ -b^{57, 16}_1 ∧ -b^{57, 16}_0 ∧ true) 
c  in CNF:
c    -b^{57, 16}_2 ∨  b^{57, 16}_1 ∨  b^{57, 16}_0 ∨ false 
c  in DIMACS:
-17372  17373  17374  0

c  3 does not represent an automaton state.
c    -(-b^{57, 16}_2 ∧  b^{57, 16}_1 ∧  b^{57, 16}_0 ∧ true) 
c  in CNF:
c     b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ false 
c  in DIMACS:
 17372 -17373 -17374  0
c  -3 does not represent an automaton state.
c    -( b^{57, 16}_2 ∧  b^{57, 16}_1 ∧  b^{57, 16}_0 ∧ true) 
c  in CNF:
c    -b^{57, 16}_2 ∨ -b^{57, 16}_1 ∨ -b^{57, 16}_0 ∨ false 
c  in DIMACS:
-17372 -17373 -17374  0

c i = 17
c  -2+1 --> -1
c    ( b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧  p_969) -> ( b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0)
c  in CNF:
c    -b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨  b^{57, 18}_2
c    -b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_1
c    -b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨  b^{57, 18}_0
c  in DIMACS:
-17375 -17376  17377 -969  17378 0
-17375 -17376  17377 -969 -17379 0
-17375 -17376  17377 -969  17380 0

c  -1+1 --> 0
c    ( b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0 ∧  p_969) -> (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧ -b^{57, 18}_0)
c  in CNF:
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_2
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_1
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_0
c  in DIMACS:
-17375  17376 -17377 -969 -17378 0
-17375  17376 -17377 -969 -17379 0
-17375  17376 -17377 -969 -17380 0

c  0+1 --> 1
c    (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧  p_969) -> (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0)
c  in CNF:
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_2
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_1
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨  b^{57, 18}_0
c  in DIMACS:
 17375  17376  17377 -969 -17378 0
 17375  17376  17377 -969 -17379 0
 17375  17376  17377 -969  17380 0

c  1+1 --> 2
c    (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0 ∧  p_969) -> (-b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0)
c  in CNF:
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_2
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨  b^{57, 18}_1
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ -p_969 ∨ -b^{57, 18}_0
c  in DIMACS:
 17375  17376 -17377 -969 -17378 0
 17375  17376 -17377 -969  17379 0
 17375  17376 -17377 -969 -17380 0

c  2+1 --> break 
c    (-b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧  p_969) -> break
c  in CNF:
c     b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 17375 -17376  17377 -969 1162 0


c  2-1 --> 1
c    (-b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧ -p_969) -> (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0)
c  in CNF:
c     b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_2
c     b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_1
c     b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨  b^{57, 18}_0
c  in DIMACS:
 17375 -17376  17377  969 -17378 0
 17375 -17376  17377  969 -17379 0
 17375 -17376  17377  969  17380 0

c  1-1 --> 0
c    (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0 ∧ -p_969) -> (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧ -b^{57, 18}_0)
c  in CNF:
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_2
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_1
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_0
c  in DIMACS:
 17375  17376 -17377  969 -17378 0
 17375  17376 -17377  969 -17379 0
 17375  17376 -17377  969 -17380 0

c  0-1 --> -1
c    (-b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧ -p_969) -> ( b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0)
c  in CNF:
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨  b^{57, 18}_2
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_1
c     b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨  b^{57, 18}_0
c  in DIMACS:
 17375  17376  17377  969  17378 0
 17375  17376  17377  969 -17379 0
 17375  17376  17377  969  17380 0

c  -1-1 --> -2
c    ( b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧  b^{57, 17}_0 ∧ -p_969) -> ( b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0)
c  in CNF:
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨  b^{57, 18}_2
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨  b^{57, 18}_1
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨  p_969 ∨ -b^{57, 18}_0
c  in DIMACS:
-17375  17376 -17377  969  17378 0
-17375  17376 -17377  969  17379 0
-17375  17376 -17377  969 -17380 0

c  -2-1 --> break 
c    ( b^{57, 17}_2 ∧  b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨  b^{57, 17}_0 ∨  p_969 ∨ break
c  in DIMACS:
-17375 -17376  17377  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 17}_2 ∧ -b^{57, 17}_1 ∧ -b^{57, 17}_0 ∧ true) 
c  in CNF:
c    -b^{57, 17}_2 ∨  b^{57, 17}_1 ∨  b^{57, 17}_0 ∨ false 
c  in DIMACS:
-17375  17376  17377  0

c  3 does not represent an automaton state.
c    -(-b^{57, 17}_2 ∧  b^{57, 17}_1 ∧  b^{57, 17}_0 ∧ true) 
c  in CNF:
c     b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ false 
c  in DIMACS:
 17375 -17376 -17377  0
c  -3 does not represent an automaton state.
c    -( b^{57, 17}_2 ∧  b^{57, 17}_1 ∧  b^{57, 17}_0 ∧ true) 
c  in CNF:
c    -b^{57, 17}_2 ∨ -b^{57, 17}_1 ∨ -b^{57, 17}_0 ∨ false 
c  in DIMACS:
-17375 -17376 -17377  0

c i = 18
c  -2+1 --> -1
c    ( b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧  p_1026) -> ( b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0)
c  in CNF:
c    -b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨  b^{57, 19}_2
c    -b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_1
c    -b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨  b^{57, 19}_0
c  in DIMACS:
-17378 -17379  17380 -1026  17381 0
-17378 -17379  17380 -1026 -17382 0
-17378 -17379  17380 -1026  17383 0

c  -1+1 --> 0
c    ( b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0 ∧  p_1026) -> (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧ -b^{57, 19}_0)
c  in CNF:
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_2
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_1
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_0
c  in DIMACS:
-17378  17379 -17380 -1026 -17381 0
-17378  17379 -17380 -1026 -17382 0
-17378  17379 -17380 -1026 -17383 0

c  0+1 --> 1
c    (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧  p_1026) -> (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0)
c  in CNF:
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_2
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_1
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨  b^{57, 19}_0
c  in DIMACS:
 17378  17379  17380 -1026 -17381 0
 17378  17379  17380 -1026 -17382 0
 17378  17379  17380 -1026  17383 0

c  1+1 --> 2
c    (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0 ∧  p_1026) -> (-b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0)
c  in CNF:
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_2
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨  b^{57, 19}_1
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ -p_1026 ∨ -b^{57, 19}_0
c  in DIMACS:
 17378  17379 -17380 -1026 -17381 0
 17378  17379 -17380 -1026  17382 0
 17378  17379 -17380 -1026 -17383 0

c  2+1 --> break 
c    (-b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 17378 -17379  17380 -1026 1162 0


c  2-1 --> 1
c    (-b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧ -p_1026) -> (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0)
c  in CNF:
c     b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_2
c     b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_1
c     b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨  b^{57, 19}_0
c  in DIMACS:
 17378 -17379  17380  1026 -17381 0
 17378 -17379  17380  1026 -17382 0
 17378 -17379  17380  1026  17383 0

c  1-1 --> 0
c    (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0 ∧ -p_1026) -> (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧ -b^{57, 19}_0)
c  in CNF:
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_2
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_1
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_0
c  in DIMACS:
 17378  17379 -17380  1026 -17381 0
 17378  17379 -17380  1026 -17382 0
 17378  17379 -17380  1026 -17383 0

c  0-1 --> -1
c    (-b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧ -p_1026) -> ( b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0)
c  in CNF:
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨  b^{57, 19}_2
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_1
c     b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨  b^{57, 19}_0
c  in DIMACS:
 17378  17379  17380  1026  17381 0
 17378  17379  17380  1026 -17382 0
 17378  17379  17380  1026  17383 0

c  -1-1 --> -2
c    ( b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧  b^{57, 18}_0 ∧ -p_1026) -> ( b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0)
c  in CNF:
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨  b^{57, 19}_2
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨  b^{57, 19}_1
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨  p_1026 ∨ -b^{57, 19}_0
c  in DIMACS:
-17378  17379 -17380  1026  17381 0
-17378  17379 -17380  1026  17382 0
-17378  17379 -17380  1026 -17383 0

c  -2-1 --> break 
c    ( b^{57, 18}_2 ∧  b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨  b^{57, 18}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-17378 -17379  17380  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 18}_2 ∧ -b^{57, 18}_1 ∧ -b^{57, 18}_0 ∧ true) 
c  in CNF:
c    -b^{57, 18}_2 ∨  b^{57, 18}_1 ∨  b^{57, 18}_0 ∨ false 
c  in DIMACS:
-17378  17379  17380  0

c  3 does not represent an automaton state.
c    -(-b^{57, 18}_2 ∧  b^{57, 18}_1 ∧  b^{57, 18}_0 ∧ true) 
c  in CNF:
c     b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ false 
c  in DIMACS:
 17378 -17379 -17380  0
c  -3 does not represent an automaton state.
c    -( b^{57, 18}_2 ∧  b^{57, 18}_1 ∧  b^{57, 18}_0 ∧ true) 
c  in CNF:
c    -b^{57, 18}_2 ∨ -b^{57, 18}_1 ∨ -b^{57, 18}_0 ∨ false 
c  in DIMACS:
-17378 -17379 -17380  0

c i = 19
c  -2+1 --> -1
c    ( b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧  p_1083) -> ( b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0)
c  in CNF:
c    -b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨  b^{57, 20}_2
c    -b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_1
c    -b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨  b^{57, 20}_0
c  in DIMACS:
-17381 -17382  17383 -1083  17384 0
-17381 -17382  17383 -1083 -17385 0
-17381 -17382  17383 -1083  17386 0

c  -1+1 --> 0
c    ( b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0 ∧  p_1083) -> (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧ -b^{57, 20}_0)
c  in CNF:
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_2
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_1
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_0
c  in DIMACS:
-17381  17382 -17383 -1083 -17384 0
-17381  17382 -17383 -1083 -17385 0
-17381  17382 -17383 -1083 -17386 0

c  0+1 --> 1
c    (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧  p_1083) -> (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0)
c  in CNF:
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_2
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_1
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨  b^{57, 20}_0
c  in DIMACS:
 17381  17382  17383 -1083 -17384 0
 17381  17382  17383 -1083 -17385 0
 17381  17382  17383 -1083  17386 0

c  1+1 --> 2
c    (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0 ∧  p_1083) -> (-b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0)
c  in CNF:
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_2
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨  b^{57, 20}_1
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ -p_1083 ∨ -b^{57, 20}_0
c  in DIMACS:
 17381  17382 -17383 -1083 -17384 0
 17381  17382 -17383 -1083  17385 0
 17381  17382 -17383 -1083 -17386 0

c  2+1 --> break 
c    (-b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧  p_1083) -> break
c  in CNF:
c     b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ -p_1083 ∨ break
c  in DIMACS:
 17381 -17382  17383 -1083 1162 0


c  2-1 --> 1
c    (-b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧ -p_1083) -> (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0)
c  in CNF:
c     b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_2
c     b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_1
c     b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨  b^{57, 20}_0
c  in DIMACS:
 17381 -17382  17383  1083 -17384 0
 17381 -17382  17383  1083 -17385 0
 17381 -17382  17383  1083  17386 0

c  1-1 --> 0
c    (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0 ∧ -p_1083) -> (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧ -b^{57, 20}_0)
c  in CNF:
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_2
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_1
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_0
c  in DIMACS:
 17381  17382 -17383  1083 -17384 0
 17381  17382 -17383  1083 -17385 0
 17381  17382 -17383  1083 -17386 0

c  0-1 --> -1
c    (-b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧ -p_1083) -> ( b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0)
c  in CNF:
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨  b^{57, 20}_2
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_1
c     b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨  b^{57, 20}_0
c  in DIMACS:
 17381  17382  17383  1083  17384 0
 17381  17382  17383  1083 -17385 0
 17381  17382  17383  1083  17386 0

c  -1-1 --> -2
c    ( b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧  b^{57, 19}_0 ∧ -p_1083) -> ( b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0)
c  in CNF:
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨  b^{57, 20}_2
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨  b^{57, 20}_1
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨  p_1083 ∨ -b^{57, 20}_0
c  in DIMACS:
-17381  17382 -17383  1083  17384 0
-17381  17382 -17383  1083  17385 0
-17381  17382 -17383  1083 -17386 0

c  -2-1 --> break 
c    ( b^{57, 19}_2 ∧  b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧ -p_1083) -> break
c  in CNF:
c    -b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨  b^{57, 19}_0 ∨  p_1083 ∨ break
c  in DIMACS:
-17381 -17382  17383  1083 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 19}_2 ∧ -b^{57, 19}_1 ∧ -b^{57, 19}_0 ∧ true) 
c  in CNF:
c    -b^{57, 19}_2 ∨  b^{57, 19}_1 ∨  b^{57, 19}_0 ∨ false 
c  in DIMACS:
-17381  17382  17383  0

c  3 does not represent an automaton state.
c    -(-b^{57, 19}_2 ∧  b^{57, 19}_1 ∧  b^{57, 19}_0 ∧ true) 
c  in CNF:
c     b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ false 
c  in DIMACS:
 17381 -17382 -17383  0
c  -3 does not represent an automaton state.
c    -( b^{57, 19}_2 ∧  b^{57, 19}_1 ∧  b^{57, 19}_0 ∧ true) 
c  in CNF:
c    -b^{57, 19}_2 ∨ -b^{57, 19}_1 ∨ -b^{57, 19}_0 ∨ false 
c  in DIMACS:
-17381 -17382 -17383  0

c i = 20
c  -2+1 --> -1
c    ( b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧  p_1140) -> ( b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧  b^{57, 21}_0)
c  in CNF:
c    -b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨  b^{57, 21}_2
c    -b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_1
c    -b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨  b^{57, 21}_0
c  in DIMACS:
-17384 -17385  17386 -1140  17387 0
-17384 -17385  17386 -1140 -17388 0
-17384 -17385  17386 -1140  17389 0

c  -1+1 --> 0
c    ( b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0 ∧  p_1140) -> (-b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧ -b^{57, 21}_0)
c  in CNF:
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_2
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_1
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_0
c  in DIMACS:
-17384  17385 -17386 -1140 -17387 0
-17384  17385 -17386 -1140 -17388 0
-17384  17385 -17386 -1140 -17389 0

c  0+1 --> 1
c    (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧  p_1140) -> (-b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧  b^{57, 21}_0)
c  in CNF:
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_2
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_1
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨  b^{57, 21}_0
c  in DIMACS:
 17384  17385  17386 -1140 -17387 0
 17384  17385  17386 -1140 -17388 0
 17384  17385  17386 -1140  17389 0

c  1+1 --> 2
c    (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0 ∧  p_1140) -> (-b^{57, 21}_2 ∧  b^{57, 21}_1 ∧ -b^{57, 21}_0)
c  in CNF:
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_2
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨  b^{57, 21}_1
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ -p_1140 ∨ -b^{57, 21}_0
c  in DIMACS:
 17384  17385 -17386 -1140 -17387 0
 17384  17385 -17386 -1140  17388 0
 17384  17385 -17386 -1140 -17389 0

c  2+1 --> break 
c    (-b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 17384 -17385  17386 -1140 1162 0


c  2-1 --> 1
c    (-b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧ -p_1140) -> (-b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧  b^{57, 21}_0)
c  in CNF:
c     b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_2
c     b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_1
c     b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨  b^{57, 21}_0
c  in DIMACS:
 17384 -17385  17386  1140 -17387 0
 17384 -17385  17386  1140 -17388 0
 17384 -17385  17386  1140  17389 0

c  1-1 --> 0
c    (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0 ∧ -p_1140) -> (-b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧ -b^{57, 21}_0)
c  in CNF:
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_2
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_1
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_0
c  in DIMACS:
 17384  17385 -17386  1140 -17387 0
 17384  17385 -17386  1140 -17388 0
 17384  17385 -17386  1140 -17389 0

c  0-1 --> -1
c    (-b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧ -p_1140) -> ( b^{57, 21}_2 ∧ -b^{57, 21}_1 ∧  b^{57, 21}_0)
c  in CNF:
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨  b^{57, 21}_2
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_1
c     b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨  b^{57, 21}_0
c  in DIMACS:
 17384  17385  17386  1140  17387 0
 17384  17385  17386  1140 -17388 0
 17384  17385  17386  1140  17389 0

c  -1-1 --> -2
c    ( b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧  b^{57, 20}_0 ∧ -p_1140) -> ( b^{57, 21}_2 ∧  b^{57, 21}_1 ∧ -b^{57, 21}_0)
c  in CNF:
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨  b^{57, 21}_2
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨  b^{57, 21}_1
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨  p_1140 ∨ -b^{57, 21}_0
c  in DIMACS:
-17384  17385 -17386  1140  17387 0
-17384  17385 -17386  1140  17388 0
-17384  17385 -17386  1140 -17389 0

c  -2-1 --> break 
c    ( b^{57, 20}_2 ∧  b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨  b^{57, 20}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-17384 -17385  17386  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{57, 20}_2 ∧ -b^{57, 20}_1 ∧ -b^{57, 20}_0 ∧ true) 
c  in CNF:
c    -b^{57, 20}_2 ∨  b^{57, 20}_1 ∨  b^{57, 20}_0 ∨ false 
c  in DIMACS:
-17384  17385  17386  0

c  3 does not represent an automaton state.
c    -(-b^{57, 20}_2 ∧  b^{57, 20}_1 ∧  b^{57, 20}_0 ∧ true) 
c  in CNF:
c     b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ false 
c  in DIMACS:
 17384 -17385 -17386  0
c  -3 does not represent an automaton state.
c    -( b^{57, 20}_2 ∧  b^{57, 20}_1 ∧  b^{57, 20}_0 ∧ true) 
c  in CNF:
c    -b^{57, 20}_2 ∨ -b^{57, 20}_1 ∨ -b^{57, 20}_0 ∨ false 
c  in DIMACS:
-17384 -17385 -17386  0

c INIT for k = 58
c    -b^{58, 1}_2
c    -b^{58, 1}_1
c    -b^{58, 1}_0
c  in DIMACS:
-17390 0
-17391 0
-17392 0

c Transitions for k = 58
c i = 1
c  -2+1 --> -1
c    ( b^{58, 1}_2 ∧  b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧  p_58) -> ( b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0)
c  in CNF:
c    -b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨  b^{58, 2}_2
c    -b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_1
c    -b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨  b^{58, 2}_0
c  in DIMACS:
-17390 -17391  17392 -58  17393 0
-17390 -17391  17392 -58 -17394 0
-17390 -17391  17392 -58  17395 0

c  -1+1 --> 0
c    ( b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧  b^{58, 1}_0 ∧  p_58) -> (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧ -b^{58, 2}_0)
c  in CNF:
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_2
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_1
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_0
c  in DIMACS:
-17390  17391 -17392 -58 -17393 0
-17390  17391 -17392 -58 -17394 0
-17390  17391 -17392 -58 -17395 0

c  0+1 --> 1
c    (-b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧  p_58) -> (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0)
c  in CNF:
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_2
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_1
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨  b^{58, 2}_0
c  in DIMACS:
 17390  17391  17392 -58 -17393 0
 17390  17391  17392 -58 -17394 0
 17390  17391  17392 -58  17395 0

c  1+1 --> 2
c    (-b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧  b^{58, 1}_0 ∧  p_58) -> (-b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0)
c  in CNF:
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_2
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨  b^{58, 2}_1
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ -p_58 ∨ -b^{58, 2}_0
c  in DIMACS:
 17390  17391 -17392 -58 -17393 0
 17390  17391 -17392 -58  17394 0
 17390  17391 -17392 -58 -17395 0

c  2+1 --> break 
c    (-b^{58, 1}_2 ∧  b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧  p_58) -> break
c  in CNF:
c     b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ -p_58 ∨ break
c  in DIMACS:
 17390 -17391  17392 -58 1162 0


c  2-1 --> 1
c    (-b^{58, 1}_2 ∧  b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧ -p_58) -> (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0)
c  in CNF:
c     b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_2
c     b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_1
c     b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨  b^{58, 2}_0
c  in DIMACS:
 17390 -17391  17392  58 -17393 0
 17390 -17391  17392  58 -17394 0
 17390 -17391  17392  58  17395 0

c  1-1 --> 0
c    (-b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧  b^{58, 1}_0 ∧ -p_58) -> (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧ -b^{58, 2}_0)
c  in CNF:
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_2
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_1
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_0
c  in DIMACS:
 17390  17391 -17392  58 -17393 0
 17390  17391 -17392  58 -17394 0
 17390  17391 -17392  58 -17395 0

c  0-1 --> -1
c    (-b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧ -p_58) -> ( b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0)
c  in CNF:
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨  b^{58, 2}_2
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_1
c     b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨  b^{58, 2}_0
c  in DIMACS:
 17390  17391  17392  58  17393 0
 17390  17391  17392  58 -17394 0
 17390  17391  17392  58  17395 0

c  -1-1 --> -2
c    ( b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧  b^{58, 1}_0 ∧ -p_58) -> ( b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0)
c  in CNF:
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨  b^{58, 2}_2
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨  b^{58, 2}_1
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨  p_58 ∨ -b^{58, 2}_0
c  in DIMACS:
-17390  17391 -17392  58  17393 0
-17390  17391 -17392  58  17394 0
-17390  17391 -17392  58 -17395 0

c  -2-1 --> break 
c    ( b^{58, 1}_2 ∧  b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧ -p_58) -> break
c  in CNF:
c    -b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨  b^{58, 1}_0 ∨  p_58 ∨ break
c  in DIMACS:
-17390 -17391  17392  58 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 1}_2 ∧ -b^{58, 1}_1 ∧ -b^{58, 1}_0 ∧ true) 
c  in CNF:
c    -b^{58, 1}_2 ∨  b^{58, 1}_1 ∨  b^{58, 1}_0 ∨ false 
c  in DIMACS:
-17390  17391  17392  0

c  3 does not represent an automaton state.
c    -(-b^{58, 1}_2 ∧  b^{58, 1}_1 ∧  b^{58, 1}_0 ∧ true) 
c  in CNF:
c     b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ false 
c  in DIMACS:
 17390 -17391 -17392  0
c  -3 does not represent an automaton state.
c    -( b^{58, 1}_2 ∧  b^{58, 1}_1 ∧  b^{58, 1}_0 ∧ true) 
c  in CNF:
c    -b^{58, 1}_2 ∨ -b^{58, 1}_1 ∨ -b^{58, 1}_0 ∨ false 
c  in DIMACS:
-17390 -17391 -17392  0

c i = 2
c  -2+1 --> -1
c    ( b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧  p_116) -> ( b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0)
c  in CNF:
c    -b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨  b^{58, 3}_2
c    -b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_1
c    -b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨  b^{58, 3}_0
c  in DIMACS:
-17393 -17394  17395 -116  17396 0
-17393 -17394  17395 -116 -17397 0
-17393 -17394  17395 -116  17398 0

c  -1+1 --> 0
c    ( b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0 ∧  p_116) -> (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧ -b^{58, 3}_0)
c  in CNF:
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_2
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_1
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_0
c  in DIMACS:
-17393  17394 -17395 -116 -17396 0
-17393  17394 -17395 -116 -17397 0
-17393  17394 -17395 -116 -17398 0

c  0+1 --> 1
c    (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧  p_116) -> (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0)
c  in CNF:
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_2
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_1
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨  b^{58, 3}_0
c  in DIMACS:
 17393  17394  17395 -116 -17396 0
 17393  17394  17395 -116 -17397 0
 17393  17394  17395 -116  17398 0

c  1+1 --> 2
c    (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0 ∧  p_116) -> (-b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0)
c  in CNF:
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_2
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨  b^{58, 3}_1
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ -p_116 ∨ -b^{58, 3}_0
c  in DIMACS:
 17393  17394 -17395 -116 -17396 0
 17393  17394 -17395 -116  17397 0
 17393  17394 -17395 -116 -17398 0

c  2+1 --> break 
c    (-b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧  p_116) -> break
c  in CNF:
c     b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 17393 -17394  17395 -116 1162 0


c  2-1 --> 1
c    (-b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧ -p_116) -> (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0)
c  in CNF:
c     b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_2
c     b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_1
c     b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨  b^{58, 3}_0
c  in DIMACS:
 17393 -17394  17395  116 -17396 0
 17393 -17394  17395  116 -17397 0
 17393 -17394  17395  116  17398 0

c  1-1 --> 0
c    (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0 ∧ -p_116) -> (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧ -b^{58, 3}_0)
c  in CNF:
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_2
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_1
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_0
c  in DIMACS:
 17393  17394 -17395  116 -17396 0
 17393  17394 -17395  116 -17397 0
 17393  17394 -17395  116 -17398 0

c  0-1 --> -1
c    (-b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧ -p_116) -> ( b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0)
c  in CNF:
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨  b^{58, 3}_2
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_1
c     b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨  b^{58, 3}_0
c  in DIMACS:
 17393  17394  17395  116  17396 0
 17393  17394  17395  116 -17397 0
 17393  17394  17395  116  17398 0

c  -1-1 --> -2
c    ( b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧  b^{58, 2}_0 ∧ -p_116) -> ( b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0)
c  in CNF:
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨  b^{58, 3}_2
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨  b^{58, 3}_1
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨  p_116 ∨ -b^{58, 3}_0
c  in DIMACS:
-17393  17394 -17395  116  17396 0
-17393  17394 -17395  116  17397 0
-17393  17394 -17395  116 -17398 0

c  -2-1 --> break 
c    ( b^{58, 2}_2 ∧  b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨  b^{58, 2}_0 ∨  p_116 ∨ break
c  in DIMACS:
-17393 -17394  17395  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 2}_2 ∧ -b^{58, 2}_1 ∧ -b^{58, 2}_0 ∧ true) 
c  in CNF:
c    -b^{58, 2}_2 ∨  b^{58, 2}_1 ∨  b^{58, 2}_0 ∨ false 
c  in DIMACS:
-17393  17394  17395  0

c  3 does not represent an automaton state.
c    -(-b^{58, 2}_2 ∧  b^{58, 2}_1 ∧  b^{58, 2}_0 ∧ true) 
c  in CNF:
c     b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ false 
c  in DIMACS:
 17393 -17394 -17395  0
c  -3 does not represent an automaton state.
c    -( b^{58, 2}_2 ∧  b^{58, 2}_1 ∧  b^{58, 2}_0 ∧ true) 
c  in CNF:
c    -b^{58, 2}_2 ∨ -b^{58, 2}_1 ∨ -b^{58, 2}_0 ∨ false 
c  in DIMACS:
-17393 -17394 -17395  0

c i = 3
c  -2+1 --> -1
c    ( b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧  p_174) -> ( b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0)
c  in CNF:
c    -b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨  b^{58, 4}_2
c    -b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_1
c    -b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨  b^{58, 4}_0
c  in DIMACS:
-17396 -17397  17398 -174  17399 0
-17396 -17397  17398 -174 -17400 0
-17396 -17397  17398 -174  17401 0

c  -1+1 --> 0
c    ( b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0 ∧  p_174) -> (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧ -b^{58, 4}_0)
c  in CNF:
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_2
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_1
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_0
c  in DIMACS:
-17396  17397 -17398 -174 -17399 0
-17396  17397 -17398 -174 -17400 0
-17396  17397 -17398 -174 -17401 0

c  0+1 --> 1
c    (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧  p_174) -> (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0)
c  in CNF:
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_2
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_1
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨  b^{58, 4}_0
c  in DIMACS:
 17396  17397  17398 -174 -17399 0
 17396  17397  17398 -174 -17400 0
 17396  17397  17398 -174  17401 0

c  1+1 --> 2
c    (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0 ∧  p_174) -> (-b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0)
c  in CNF:
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_2
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨  b^{58, 4}_1
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ -p_174 ∨ -b^{58, 4}_0
c  in DIMACS:
 17396  17397 -17398 -174 -17399 0
 17396  17397 -17398 -174  17400 0
 17396  17397 -17398 -174 -17401 0

c  2+1 --> break 
c    (-b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧  p_174) -> break
c  in CNF:
c     b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 17396 -17397  17398 -174 1162 0


c  2-1 --> 1
c    (-b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧ -p_174) -> (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0)
c  in CNF:
c     b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_2
c     b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_1
c     b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨  b^{58, 4}_0
c  in DIMACS:
 17396 -17397  17398  174 -17399 0
 17396 -17397  17398  174 -17400 0
 17396 -17397  17398  174  17401 0

c  1-1 --> 0
c    (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0 ∧ -p_174) -> (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧ -b^{58, 4}_0)
c  in CNF:
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_2
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_1
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_0
c  in DIMACS:
 17396  17397 -17398  174 -17399 0
 17396  17397 -17398  174 -17400 0
 17396  17397 -17398  174 -17401 0

c  0-1 --> -1
c    (-b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧ -p_174) -> ( b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0)
c  in CNF:
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨  b^{58, 4}_2
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_1
c     b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨  b^{58, 4}_0
c  in DIMACS:
 17396  17397  17398  174  17399 0
 17396  17397  17398  174 -17400 0
 17396  17397  17398  174  17401 0

c  -1-1 --> -2
c    ( b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧  b^{58, 3}_0 ∧ -p_174) -> ( b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0)
c  in CNF:
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨  b^{58, 4}_2
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨  b^{58, 4}_1
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨  p_174 ∨ -b^{58, 4}_0
c  in DIMACS:
-17396  17397 -17398  174  17399 0
-17396  17397 -17398  174  17400 0
-17396  17397 -17398  174 -17401 0

c  -2-1 --> break 
c    ( b^{58, 3}_2 ∧  b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨  b^{58, 3}_0 ∨  p_174 ∨ break
c  in DIMACS:
-17396 -17397  17398  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 3}_2 ∧ -b^{58, 3}_1 ∧ -b^{58, 3}_0 ∧ true) 
c  in CNF:
c    -b^{58, 3}_2 ∨  b^{58, 3}_1 ∨  b^{58, 3}_0 ∨ false 
c  in DIMACS:
-17396  17397  17398  0

c  3 does not represent an automaton state.
c    -(-b^{58, 3}_2 ∧  b^{58, 3}_1 ∧  b^{58, 3}_0 ∧ true) 
c  in CNF:
c     b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ false 
c  in DIMACS:
 17396 -17397 -17398  0
c  -3 does not represent an automaton state.
c    -( b^{58, 3}_2 ∧  b^{58, 3}_1 ∧  b^{58, 3}_0 ∧ true) 
c  in CNF:
c    -b^{58, 3}_2 ∨ -b^{58, 3}_1 ∨ -b^{58, 3}_0 ∨ false 
c  in DIMACS:
-17396 -17397 -17398  0

c i = 4
c  -2+1 --> -1
c    ( b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧  p_232) -> ( b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0)
c  in CNF:
c    -b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨  b^{58, 5}_2
c    -b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_1
c    -b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨  b^{58, 5}_0
c  in DIMACS:
-17399 -17400  17401 -232  17402 0
-17399 -17400  17401 -232 -17403 0
-17399 -17400  17401 -232  17404 0

c  -1+1 --> 0
c    ( b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0 ∧  p_232) -> (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧ -b^{58, 5}_0)
c  in CNF:
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_2
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_1
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_0
c  in DIMACS:
-17399  17400 -17401 -232 -17402 0
-17399  17400 -17401 -232 -17403 0
-17399  17400 -17401 -232 -17404 0

c  0+1 --> 1
c    (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧  p_232) -> (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0)
c  in CNF:
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_2
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_1
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨  b^{58, 5}_0
c  in DIMACS:
 17399  17400  17401 -232 -17402 0
 17399  17400  17401 -232 -17403 0
 17399  17400  17401 -232  17404 0

c  1+1 --> 2
c    (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0 ∧  p_232) -> (-b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0)
c  in CNF:
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_2
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨  b^{58, 5}_1
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ -p_232 ∨ -b^{58, 5}_0
c  in DIMACS:
 17399  17400 -17401 -232 -17402 0
 17399  17400 -17401 -232  17403 0
 17399  17400 -17401 -232 -17404 0

c  2+1 --> break 
c    (-b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧  p_232) -> break
c  in CNF:
c     b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 17399 -17400  17401 -232 1162 0


c  2-1 --> 1
c    (-b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧ -p_232) -> (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0)
c  in CNF:
c     b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_2
c     b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_1
c     b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨  b^{58, 5}_0
c  in DIMACS:
 17399 -17400  17401  232 -17402 0
 17399 -17400  17401  232 -17403 0
 17399 -17400  17401  232  17404 0

c  1-1 --> 0
c    (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0 ∧ -p_232) -> (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧ -b^{58, 5}_0)
c  in CNF:
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_2
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_1
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_0
c  in DIMACS:
 17399  17400 -17401  232 -17402 0
 17399  17400 -17401  232 -17403 0
 17399  17400 -17401  232 -17404 0

c  0-1 --> -1
c    (-b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧ -p_232) -> ( b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0)
c  in CNF:
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨  b^{58, 5}_2
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_1
c     b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨  b^{58, 5}_0
c  in DIMACS:
 17399  17400  17401  232  17402 0
 17399  17400  17401  232 -17403 0
 17399  17400  17401  232  17404 0

c  -1-1 --> -2
c    ( b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧  b^{58, 4}_0 ∧ -p_232) -> ( b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0)
c  in CNF:
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨  b^{58, 5}_2
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨  b^{58, 5}_1
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨  p_232 ∨ -b^{58, 5}_0
c  in DIMACS:
-17399  17400 -17401  232  17402 0
-17399  17400 -17401  232  17403 0
-17399  17400 -17401  232 -17404 0

c  -2-1 --> break 
c    ( b^{58, 4}_2 ∧  b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨  b^{58, 4}_0 ∨  p_232 ∨ break
c  in DIMACS:
-17399 -17400  17401  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 4}_2 ∧ -b^{58, 4}_1 ∧ -b^{58, 4}_0 ∧ true) 
c  in CNF:
c    -b^{58, 4}_2 ∨  b^{58, 4}_1 ∨  b^{58, 4}_0 ∨ false 
c  in DIMACS:
-17399  17400  17401  0

c  3 does not represent an automaton state.
c    -(-b^{58, 4}_2 ∧  b^{58, 4}_1 ∧  b^{58, 4}_0 ∧ true) 
c  in CNF:
c     b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ false 
c  in DIMACS:
 17399 -17400 -17401  0
c  -3 does not represent an automaton state.
c    -( b^{58, 4}_2 ∧  b^{58, 4}_1 ∧  b^{58, 4}_0 ∧ true) 
c  in CNF:
c    -b^{58, 4}_2 ∨ -b^{58, 4}_1 ∨ -b^{58, 4}_0 ∨ false 
c  in DIMACS:
-17399 -17400 -17401  0

c i = 5
c  -2+1 --> -1
c    ( b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧  p_290) -> ( b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0)
c  in CNF:
c    -b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨  b^{58, 6}_2
c    -b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_1
c    -b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨  b^{58, 6}_0
c  in DIMACS:
-17402 -17403  17404 -290  17405 0
-17402 -17403  17404 -290 -17406 0
-17402 -17403  17404 -290  17407 0

c  -1+1 --> 0
c    ( b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0 ∧  p_290) -> (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧ -b^{58, 6}_0)
c  in CNF:
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_2
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_1
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_0
c  in DIMACS:
-17402  17403 -17404 -290 -17405 0
-17402  17403 -17404 -290 -17406 0
-17402  17403 -17404 -290 -17407 0

c  0+1 --> 1
c    (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧  p_290) -> (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0)
c  in CNF:
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_2
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_1
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨  b^{58, 6}_0
c  in DIMACS:
 17402  17403  17404 -290 -17405 0
 17402  17403  17404 -290 -17406 0
 17402  17403  17404 -290  17407 0

c  1+1 --> 2
c    (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0 ∧  p_290) -> (-b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0)
c  in CNF:
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_2
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨  b^{58, 6}_1
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ -p_290 ∨ -b^{58, 6}_0
c  in DIMACS:
 17402  17403 -17404 -290 -17405 0
 17402  17403 -17404 -290  17406 0
 17402  17403 -17404 -290 -17407 0

c  2+1 --> break 
c    (-b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧  p_290) -> break
c  in CNF:
c     b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 17402 -17403  17404 -290 1162 0


c  2-1 --> 1
c    (-b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧ -p_290) -> (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0)
c  in CNF:
c     b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_2
c     b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_1
c     b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨  b^{58, 6}_0
c  in DIMACS:
 17402 -17403  17404  290 -17405 0
 17402 -17403  17404  290 -17406 0
 17402 -17403  17404  290  17407 0

c  1-1 --> 0
c    (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0 ∧ -p_290) -> (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧ -b^{58, 6}_0)
c  in CNF:
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_2
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_1
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_0
c  in DIMACS:
 17402  17403 -17404  290 -17405 0
 17402  17403 -17404  290 -17406 0
 17402  17403 -17404  290 -17407 0

c  0-1 --> -1
c    (-b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧ -p_290) -> ( b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0)
c  in CNF:
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨  b^{58, 6}_2
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_1
c     b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨  b^{58, 6}_0
c  in DIMACS:
 17402  17403  17404  290  17405 0
 17402  17403  17404  290 -17406 0
 17402  17403  17404  290  17407 0

c  -1-1 --> -2
c    ( b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧  b^{58, 5}_0 ∧ -p_290) -> ( b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0)
c  in CNF:
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨  b^{58, 6}_2
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨  b^{58, 6}_1
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨  p_290 ∨ -b^{58, 6}_0
c  in DIMACS:
-17402  17403 -17404  290  17405 0
-17402  17403 -17404  290  17406 0
-17402  17403 -17404  290 -17407 0

c  -2-1 --> break 
c    ( b^{58, 5}_2 ∧  b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨  b^{58, 5}_0 ∨  p_290 ∨ break
c  in DIMACS:
-17402 -17403  17404  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 5}_2 ∧ -b^{58, 5}_1 ∧ -b^{58, 5}_0 ∧ true) 
c  in CNF:
c    -b^{58, 5}_2 ∨  b^{58, 5}_1 ∨  b^{58, 5}_0 ∨ false 
c  in DIMACS:
-17402  17403  17404  0

c  3 does not represent an automaton state.
c    -(-b^{58, 5}_2 ∧  b^{58, 5}_1 ∧  b^{58, 5}_0 ∧ true) 
c  in CNF:
c     b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ false 
c  in DIMACS:
 17402 -17403 -17404  0
c  -3 does not represent an automaton state.
c    -( b^{58, 5}_2 ∧  b^{58, 5}_1 ∧  b^{58, 5}_0 ∧ true) 
c  in CNF:
c    -b^{58, 5}_2 ∨ -b^{58, 5}_1 ∨ -b^{58, 5}_0 ∨ false 
c  in DIMACS:
-17402 -17403 -17404  0

c i = 6
c  -2+1 --> -1
c    ( b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧  p_348) -> ( b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0)
c  in CNF:
c    -b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨  b^{58, 7}_2
c    -b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_1
c    -b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨  b^{58, 7}_0
c  in DIMACS:
-17405 -17406  17407 -348  17408 0
-17405 -17406  17407 -348 -17409 0
-17405 -17406  17407 -348  17410 0

c  -1+1 --> 0
c    ( b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0 ∧  p_348) -> (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧ -b^{58, 7}_0)
c  in CNF:
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_2
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_1
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_0
c  in DIMACS:
-17405  17406 -17407 -348 -17408 0
-17405  17406 -17407 -348 -17409 0
-17405  17406 -17407 -348 -17410 0

c  0+1 --> 1
c    (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧  p_348) -> (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0)
c  in CNF:
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_2
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_1
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨  b^{58, 7}_0
c  in DIMACS:
 17405  17406  17407 -348 -17408 0
 17405  17406  17407 -348 -17409 0
 17405  17406  17407 -348  17410 0

c  1+1 --> 2
c    (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0 ∧  p_348) -> (-b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0)
c  in CNF:
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_2
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨  b^{58, 7}_1
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ -p_348 ∨ -b^{58, 7}_0
c  in DIMACS:
 17405  17406 -17407 -348 -17408 0
 17405  17406 -17407 -348  17409 0
 17405  17406 -17407 -348 -17410 0

c  2+1 --> break 
c    (-b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧  p_348) -> break
c  in CNF:
c     b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 17405 -17406  17407 -348 1162 0


c  2-1 --> 1
c    (-b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧ -p_348) -> (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0)
c  in CNF:
c     b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_2
c     b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_1
c     b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨  b^{58, 7}_0
c  in DIMACS:
 17405 -17406  17407  348 -17408 0
 17405 -17406  17407  348 -17409 0
 17405 -17406  17407  348  17410 0

c  1-1 --> 0
c    (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0 ∧ -p_348) -> (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧ -b^{58, 7}_0)
c  in CNF:
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_2
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_1
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_0
c  in DIMACS:
 17405  17406 -17407  348 -17408 0
 17405  17406 -17407  348 -17409 0
 17405  17406 -17407  348 -17410 0

c  0-1 --> -1
c    (-b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧ -p_348) -> ( b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0)
c  in CNF:
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨  b^{58, 7}_2
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_1
c     b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨  b^{58, 7}_0
c  in DIMACS:
 17405  17406  17407  348  17408 0
 17405  17406  17407  348 -17409 0
 17405  17406  17407  348  17410 0

c  -1-1 --> -2
c    ( b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧  b^{58, 6}_0 ∧ -p_348) -> ( b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0)
c  in CNF:
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨  b^{58, 7}_2
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨  b^{58, 7}_1
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨  p_348 ∨ -b^{58, 7}_0
c  in DIMACS:
-17405  17406 -17407  348  17408 0
-17405  17406 -17407  348  17409 0
-17405  17406 -17407  348 -17410 0

c  -2-1 --> break 
c    ( b^{58, 6}_2 ∧  b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨  b^{58, 6}_0 ∨  p_348 ∨ break
c  in DIMACS:
-17405 -17406  17407  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 6}_2 ∧ -b^{58, 6}_1 ∧ -b^{58, 6}_0 ∧ true) 
c  in CNF:
c    -b^{58, 6}_2 ∨  b^{58, 6}_1 ∨  b^{58, 6}_0 ∨ false 
c  in DIMACS:
-17405  17406  17407  0

c  3 does not represent an automaton state.
c    -(-b^{58, 6}_2 ∧  b^{58, 6}_1 ∧  b^{58, 6}_0 ∧ true) 
c  in CNF:
c     b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ false 
c  in DIMACS:
 17405 -17406 -17407  0
c  -3 does not represent an automaton state.
c    -( b^{58, 6}_2 ∧  b^{58, 6}_1 ∧  b^{58, 6}_0 ∧ true) 
c  in CNF:
c    -b^{58, 6}_2 ∨ -b^{58, 6}_1 ∨ -b^{58, 6}_0 ∨ false 
c  in DIMACS:
-17405 -17406 -17407  0

c i = 7
c  -2+1 --> -1
c    ( b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧  p_406) -> ( b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0)
c  in CNF:
c    -b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨  b^{58, 8}_2
c    -b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_1
c    -b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨  b^{58, 8}_0
c  in DIMACS:
-17408 -17409  17410 -406  17411 0
-17408 -17409  17410 -406 -17412 0
-17408 -17409  17410 -406  17413 0

c  -1+1 --> 0
c    ( b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0 ∧  p_406) -> (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧ -b^{58, 8}_0)
c  in CNF:
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_2
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_1
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_0
c  in DIMACS:
-17408  17409 -17410 -406 -17411 0
-17408  17409 -17410 -406 -17412 0
-17408  17409 -17410 -406 -17413 0

c  0+1 --> 1
c    (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧  p_406) -> (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0)
c  in CNF:
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_2
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_1
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨  b^{58, 8}_0
c  in DIMACS:
 17408  17409  17410 -406 -17411 0
 17408  17409  17410 -406 -17412 0
 17408  17409  17410 -406  17413 0

c  1+1 --> 2
c    (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0 ∧  p_406) -> (-b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0)
c  in CNF:
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_2
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨  b^{58, 8}_1
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ -p_406 ∨ -b^{58, 8}_0
c  in DIMACS:
 17408  17409 -17410 -406 -17411 0
 17408  17409 -17410 -406  17412 0
 17408  17409 -17410 -406 -17413 0

c  2+1 --> break 
c    (-b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧  p_406) -> break
c  in CNF:
c     b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 17408 -17409  17410 -406 1162 0


c  2-1 --> 1
c    (-b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧ -p_406) -> (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0)
c  in CNF:
c     b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_2
c     b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_1
c     b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨  b^{58, 8}_0
c  in DIMACS:
 17408 -17409  17410  406 -17411 0
 17408 -17409  17410  406 -17412 0
 17408 -17409  17410  406  17413 0

c  1-1 --> 0
c    (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0 ∧ -p_406) -> (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧ -b^{58, 8}_0)
c  in CNF:
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_2
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_1
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_0
c  in DIMACS:
 17408  17409 -17410  406 -17411 0
 17408  17409 -17410  406 -17412 0
 17408  17409 -17410  406 -17413 0

c  0-1 --> -1
c    (-b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧ -p_406) -> ( b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0)
c  in CNF:
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨  b^{58, 8}_2
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_1
c     b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨  b^{58, 8}_0
c  in DIMACS:
 17408  17409  17410  406  17411 0
 17408  17409  17410  406 -17412 0
 17408  17409  17410  406  17413 0

c  -1-1 --> -2
c    ( b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧  b^{58, 7}_0 ∧ -p_406) -> ( b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0)
c  in CNF:
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨  b^{58, 8}_2
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨  b^{58, 8}_1
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨  p_406 ∨ -b^{58, 8}_0
c  in DIMACS:
-17408  17409 -17410  406  17411 0
-17408  17409 -17410  406  17412 0
-17408  17409 -17410  406 -17413 0

c  -2-1 --> break 
c    ( b^{58, 7}_2 ∧  b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨  b^{58, 7}_0 ∨  p_406 ∨ break
c  in DIMACS:
-17408 -17409  17410  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 7}_2 ∧ -b^{58, 7}_1 ∧ -b^{58, 7}_0 ∧ true) 
c  in CNF:
c    -b^{58, 7}_2 ∨  b^{58, 7}_1 ∨  b^{58, 7}_0 ∨ false 
c  in DIMACS:
-17408  17409  17410  0

c  3 does not represent an automaton state.
c    -(-b^{58, 7}_2 ∧  b^{58, 7}_1 ∧  b^{58, 7}_0 ∧ true) 
c  in CNF:
c     b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ false 
c  in DIMACS:
 17408 -17409 -17410  0
c  -3 does not represent an automaton state.
c    -( b^{58, 7}_2 ∧  b^{58, 7}_1 ∧  b^{58, 7}_0 ∧ true) 
c  in CNF:
c    -b^{58, 7}_2 ∨ -b^{58, 7}_1 ∨ -b^{58, 7}_0 ∨ false 
c  in DIMACS:
-17408 -17409 -17410  0

c i = 8
c  -2+1 --> -1
c    ( b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧  p_464) -> ( b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0)
c  in CNF:
c    -b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨  b^{58, 9}_2
c    -b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_1
c    -b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨  b^{58, 9}_0
c  in DIMACS:
-17411 -17412  17413 -464  17414 0
-17411 -17412  17413 -464 -17415 0
-17411 -17412  17413 -464  17416 0

c  -1+1 --> 0
c    ( b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0 ∧  p_464) -> (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧ -b^{58, 9}_0)
c  in CNF:
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_2
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_1
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_0
c  in DIMACS:
-17411  17412 -17413 -464 -17414 0
-17411  17412 -17413 -464 -17415 0
-17411  17412 -17413 -464 -17416 0

c  0+1 --> 1
c    (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧  p_464) -> (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0)
c  in CNF:
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_2
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_1
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨  b^{58, 9}_0
c  in DIMACS:
 17411  17412  17413 -464 -17414 0
 17411  17412  17413 -464 -17415 0
 17411  17412  17413 -464  17416 0

c  1+1 --> 2
c    (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0 ∧  p_464) -> (-b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0)
c  in CNF:
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_2
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨  b^{58, 9}_1
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ -p_464 ∨ -b^{58, 9}_0
c  in DIMACS:
 17411  17412 -17413 -464 -17414 0
 17411  17412 -17413 -464  17415 0
 17411  17412 -17413 -464 -17416 0

c  2+1 --> break 
c    (-b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧  p_464) -> break
c  in CNF:
c     b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 17411 -17412  17413 -464 1162 0


c  2-1 --> 1
c    (-b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧ -p_464) -> (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0)
c  in CNF:
c     b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_2
c     b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_1
c     b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨  b^{58, 9}_0
c  in DIMACS:
 17411 -17412  17413  464 -17414 0
 17411 -17412  17413  464 -17415 0
 17411 -17412  17413  464  17416 0

c  1-1 --> 0
c    (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0 ∧ -p_464) -> (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧ -b^{58, 9}_0)
c  in CNF:
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_2
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_1
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_0
c  in DIMACS:
 17411  17412 -17413  464 -17414 0
 17411  17412 -17413  464 -17415 0
 17411  17412 -17413  464 -17416 0

c  0-1 --> -1
c    (-b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧ -p_464) -> ( b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0)
c  in CNF:
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨  b^{58, 9}_2
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_1
c     b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨  b^{58, 9}_0
c  in DIMACS:
 17411  17412  17413  464  17414 0
 17411  17412  17413  464 -17415 0
 17411  17412  17413  464  17416 0

c  -1-1 --> -2
c    ( b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧  b^{58, 8}_0 ∧ -p_464) -> ( b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0)
c  in CNF:
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨  b^{58, 9}_2
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨  b^{58, 9}_1
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨  p_464 ∨ -b^{58, 9}_0
c  in DIMACS:
-17411  17412 -17413  464  17414 0
-17411  17412 -17413  464  17415 0
-17411  17412 -17413  464 -17416 0

c  -2-1 --> break 
c    ( b^{58, 8}_2 ∧  b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨  b^{58, 8}_0 ∨  p_464 ∨ break
c  in DIMACS:
-17411 -17412  17413  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 8}_2 ∧ -b^{58, 8}_1 ∧ -b^{58, 8}_0 ∧ true) 
c  in CNF:
c    -b^{58, 8}_2 ∨  b^{58, 8}_1 ∨  b^{58, 8}_0 ∨ false 
c  in DIMACS:
-17411  17412  17413  0

c  3 does not represent an automaton state.
c    -(-b^{58, 8}_2 ∧  b^{58, 8}_1 ∧  b^{58, 8}_0 ∧ true) 
c  in CNF:
c     b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ false 
c  in DIMACS:
 17411 -17412 -17413  0
c  -3 does not represent an automaton state.
c    -( b^{58, 8}_2 ∧  b^{58, 8}_1 ∧  b^{58, 8}_0 ∧ true) 
c  in CNF:
c    -b^{58, 8}_2 ∨ -b^{58, 8}_1 ∨ -b^{58, 8}_0 ∨ false 
c  in DIMACS:
-17411 -17412 -17413  0

c i = 9
c  -2+1 --> -1
c    ( b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧  p_522) -> ( b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0)
c  in CNF:
c    -b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨  b^{58, 10}_2
c    -b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_1
c    -b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨  b^{58, 10}_0
c  in DIMACS:
-17414 -17415  17416 -522  17417 0
-17414 -17415  17416 -522 -17418 0
-17414 -17415  17416 -522  17419 0

c  -1+1 --> 0
c    ( b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0 ∧  p_522) -> (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧ -b^{58, 10}_0)
c  in CNF:
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_2
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_1
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_0
c  in DIMACS:
-17414  17415 -17416 -522 -17417 0
-17414  17415 -17416 -522 -17418 0
-17414  17415 -17416 -522 -17419 0

c  0+1 --> 1
c    (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧  p_522) -> (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0)
c  in CNF:
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_2
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_1
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨  b^{58, 10}_0
c  in DIMACS:
 17414  17415  17416 -522 -17417 0
 17414  17415  17416 -522 -17418 0
 17414  17415  17416 -522  17419 0

c  1+1 --> 2
c    (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0 ∧  p_522) -> (-b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0)
c  in CNF:
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_2
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨  b^{58, 10}_1
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ -p_522 ∨ -b^{58, 10}_0
c  in DIMACS:
 17414  17415 -17416 -522 -17417 0
 17414  17415 -17416 -522  17418 0
 17414  17415 -17416 -522 -17419 0

c  2+1 --> break 
c    (-b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧  p_522) -> break
c  in CNF:
c     b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 17414 -17415  17416 -522 1162 0


c  2-1 --> 1
c    (-b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧ -p_522) -> (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0)
c  in CNF:
c     b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_2
c     b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_1
c     b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨  b^{58, 10}_0
c  in DIMACS:
 17414 -17415  17416  522 -17417 0
 17414 -17415  17416  522 -17418 0
 17414 -17415  17416  522  17419 0

c  1-1 --> 0
c    (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0 ∧ -p_522) -> (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧ -b^{58, 10}_0)
c  in CNF:
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_2
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_1
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_0
c  in DIMACS:
 17414  17415 -17416  522 -17417 0
 17414  17415 -17416  522 -17418 0
 17414  17415 -17416  522 -17419 0

c  0-1 --> -1
c    (-b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧ -p_522) -> ( b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0)
c  in CNF:
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨  b^{58, 10}_2
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_1
c     b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨  b^{58, 10}_0
c  in DIMACS:
 17414  17415  17416  522  17417 0
 17414  17415  17416  522 -17418 0
 17414  17415  17416  522  17419 0

c  -1-1 --> -2
c    ( b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧  b^{58, 9}_0 ∧ -p_522) -> ( b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0)
c  in CNF:
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨  b^{58, 10}_2
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨  b^{58, 10}_1
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨  p_522 ∨ -b^{58, 10}_0
c  in DIMACS:
-17414  17415 -17416  522  17417 0
-17414  17415 -17416  522  17418 0
-17414  17415 -17416  522 -17419 0

c  -2-1 --> break 
c    ( b^{58, 9}_2 ∧  b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨  b^{58, 9}_0 ∨  p_522 ∨ break
c  in DIMACS:
-17414 -17415  17416  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 9}_2 ∧ -b^{58, 9}_1 ∧ -b^{58, 9}_0 ∧ true) 
c  in CNF:
c    -b^{58, 9}_2 ∨  b^{58, 9}_1 ∨  b^{58, 9}_0 ∨ false 
c  in DIMACS:
-17414  17415  17416  0

c  3 does not represent an automaton state.
c    -(-b^{58, 9}_2 ∧  b^{58, 9}_1 ∧  b^{58, 9}_0 ∧ true) 
c  in CNF:
c     b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ false 
c  in DIMACS:
 17414 -17415 -17416  0
c  -3 does not represent an automaton state.
c    -( b^{58, 9}_2 ∧  b^{58, 9}_1 ∧  b^{58, 9}_0 ∧ true) 
c  in CNF:
c    -b^{58, 9}_2 ∨ -b^{58, 9}_1 ∨ -b^{58, 9}_0 ∨ false 
c  in DIMACS:
-17414 -17415 -17416  0

c i = 10
c  -2+1 --> -1
c    ( b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧  p_580) -> ( b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0)
c  in CNF:
c    -b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨  b^{58, 11}_2
c    -b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_1
c    -b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨  b^{58, 11}_0
c  in DIMACS:
-17417 -17418  17419 -580  17420 0
-17417 -17418  17419 -580 -17421 0
-17417 -17418  17419 -580  17422 0

c  -1+1 --> 0
c    ( b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0 ∧  p_580) -> (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧ -b^{58, 11}_0)
c  in CNF:
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_2
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_1
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_0
c  in DIMACS:
-17417  17418 -17419 -580 -17420 0
-17417  17418 -17419 -580 -17421 0
-17417  17418 -17419 -580 -17422 0

c  0+1 --> 1
c    (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧  p_580) -> (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0)
c  in CNF:
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_2
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_1
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨  b^{58, 11}_0
c  in DIMACS:
 17417  17418  17419 -580 -17420 0
 17417  17418  17419 -580 -17421 0
 17417  17418  17419 -580  17422 0

c  1+1 --> 2
c    (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0 ∧  p_580) -> (-b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0)
c  in CNF:
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_2
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨  b^{58, 11}_1
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ -p_580 ∨ -b^{58, 11}_0
c  in DIMACS:
 17417  17418 -17419 -580 -17420 0
 17417  17418 -17419 -580  17421 0
 17417  17418 -17419 -580 -17422 0

c  2+1 --> break 
c    (-b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧  p_580) -> break
c  in CNF:
c     b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 17417 -17418  17419 -580 1162 0


c  2-1 --> 1
c    (-b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧ -p_580) -> (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0)
c  in CNF:
c     b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_2
c     b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_1
c     b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨  b^{58, 11}_0
c  in DIMACS:
 17417 -17418  17419  580 -17420 0
 17417 -17418  17419  580 -17421 0
 17417 -17418  17419  580  17422 0

c  1-1 --> 0
c    (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0 ∧ -p_580) -> (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧ -b^{58, 11}_0)
c  in CNF:
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_2
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_1
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_0
c  in DIMACS:
 17417  17418 -17419  580 -17420 0
 17417  17418 -17419  580 -17421 0
 17417  17418 -17419  580 -17422 0

c  0-1 --> -1
c    (-b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧ -p_580) -> ( b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0)
c  in CNF:
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨  b^{58, 11}_2
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_1
c     b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨  b^{58, 11}_0
c  in DIMACS:
 17417  17418  17419  580  17420 0
 17417  17418  17419  580 -17421 0
 17417  17418  17419  580  17422 0

c  -1-1 --> -2
c    ( b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧  b^{58, 10}_0 ∧ -p_580) -> ( b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0)
c  in CNF:
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨  b^{58, 11}_2
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨  b^{58, 11}_1
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨  p_580 ∨ -b^{58, 11}_0
c  in DIMACS:
-17417  17418 -17419  580  17420 0
-17417  17418 -17419  580  17421 0
-17417  17418 -17419  580 -17422 0

c  -2-1 --> break 
c    ( b^{58, 10}_2 ∧  b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨  b^{58, 10}_0 ∨  p_580 ∨ break
c  in DIMACS:
-17417 -17418  17419  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 10}_2 ∧ -b^{58, 10}_1 ∧ -b^{58, 10}_0 ∧ true) 
c  in CNF:
c    -b^{58, 10}_2 ∨  b^{58, 10}_1 ∨  b^{58, 10}_0 ∨ false 
c  in DIMACS:
-17417  17418  17419  0

c  3 does not represent an automaton state.
c    -(-b^{58, 10}_2 ∧  b^{58, 10}_1 ∧  b^{58, 10}_0 ∧ true) 
c  in CNF:
c     b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ false 
c  in DIMACS:
 17417 -17418 -17419  0
c  -3 does not represent an automaton state.
c    -( b^{58, 10}_2 ∧  b^{58, 10}_1 ∧  b^{58, 10}_0 ∧ true) 
c  in CNF:
c    -b^{58, 10}_2 ∨ -b^{58, 10}_1 ∨ -b^{58, 10}_0 ∨ false 
c  in DIMACS:
-17417 -17418 -17419  0

c i = 11
c  -2+1 --> -1
c    ( b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧  p_638) -> ( b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0)
c  in CNF:
c    -b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨  b^{58, 12}_2
c    -b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_1
c    -b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨  b^{58, 12}_0
c  in DIMACS:
-17420 -17421  17422 -638  17423 0
-17420 -17421  17422 -638 -17424 0
-17420 -17421  17422 -638  17425 0

c  -1+1 --> 0
c    ( b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0 ∧  p_638) -> (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧ -b^{58, 12}_0)
c  in CNF:
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_2
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_1
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_0
c  in DIMACS:
-17420  17421 -17422 -638 -17423 0
-17420  17421 -17422 -638 -17424 0
-17420  17421 -17422 -638 -17425 0

c  0+1 --> 1
c    (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧  p_638) -> (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0)
c  in CNF:
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_2
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_1
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨  b^{58, 12}_0
c  in DIMACS:
 17420  17421  17422 -638 -17423 0
 17420  17421  17422 -638 -17424 0
 17420  17421  17422 -638  17425 0

c  1+1 --> 2
c    (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0 ∧  p_638) -> (-b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0)
c  in CNF:
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_2
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨  b^{58, 12}_1
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ -p_638 ∨ -b^{58, 12}_0
c  in DIMACS:
 17420  17421 -17422 -638 -17423 0
 17420  17421 -17422 -638  17424 0
 17420  17421 -17422 -638 -17425 0

c  2+1 --> break 
c    (-b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧  p_638) -> break
c  in CNF:
c     b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 17420 -17421  17422 -638 1162 0


c  2-1 --> 1
c    (-b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧ -p_638) -> (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0)
c  in CNF:
c     b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_2
c     b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_1
c     b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨  b^{58, 12}_0
c  in DIMACS:
 17420 -17421  17422  638 -17423 0
 17420 -17421  17422  638 -17424 0
 17420 -17421  17422  638  17425 0

c  1-1 --> 0
c    (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0 ∧ -p_638) -> (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧ -b^{58, 12}_0)
c  in CNF:
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_2
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_1
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_0
c  in DIMACS:
 17420  17421 -17422  638 -17423 0
 17420  17421 -17422  638 -17424 0
 17420  17421 -17422  638 -17425 0

c  0-1 --> -1
c    (-b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧ -p_638) -> ( b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0)
c  in CNF:
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨  b^{58, 12}_2
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_1
c     b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨  b^{58, 12}_0
c  in DIMACS:
 17420  17421  17422  638  17423 0
 17420  17421  17422  638 -17424 0
 17420  17421  17422  638  17425 0

c  -1-1 --> -2
c    ( b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧  b^{58, 11}_0 ∧ -p_638) -> ( b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0)
c  in CNF:
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨  b^{58, 12}_2
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨  b^{58, 12}_1
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨  p_638 ∨ -b^{58, 12}_0
c  in DIMACS:
-17420  17421 -17422  638  17423 0
-17420  17421 -17422  638  17424 0
-17420  17421 -17422  638 -17425 0

c  -2-1 --> break 
c    ( b^{58, 11}_2 ∧  b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨  b^{58, 11}_0 ∨  p_638 ∨ break
c  in DIMACS:
-17420 -17421  17422  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 11}_2 ∧ -b^{58, 11}_1 ∧ -b^{58, 11}_0 ∧ true) 
c  in CNF:
c    -b^{58, 11}_2 ∨  b^{58, 11}_1 ∨  b^{58, 11}_0 ∨ false 
c  in DIMACS:
-17420  17421  17422  0

c  3 does not represent an automaton state.
c    -(-b^{58, 11}_2 ∧  b^{58, 11}_1 ∧  b^{58, 11}_0 ∧ true) 
c  in CNF:
c     b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ false 
c  in DIMACS:
 17420 -17421 -17422  0
c  -3 does not represent an automaton state.
c    -( b^{58, 11}_2 ∧  b^{58, 11}_1 ∧  b^{58, 11}_0 ∧ true) 
c  in CNF:
c    -b^{58, 11}_2 ∨ -b^{58, 11}_1 ∨ -b^{58, 11}_0 ∨ false 
c  in DIMACS:
-17420 -17421 -17422  0

c i = 12
c  -2+1 --> -1
c    ( b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧  p_696) -> ( b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0)
c  in CNF:
c    -b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨  b^{58, 13}_2
c    -b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_1
c    -b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨  b^{58, 13}_0
c  in DIMACS:
-17423 -17424  17425 -696  17426 0
-17423 -17424  17425 -696 -17427 0
-17423 -17424  17425 -696  17428 0

c  -1+1 --> 0
c    ( b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0 ∧  p_696) -> (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧ -b^{58, 13}_0)
c  in CNF:
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_2
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_1
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_0
c  in DIMACS:
-17423  17424 -17425 -696 -17426 0
-17423  17424 -17425 -696 -17427 0
-17423  17424 -17425 -696 -17428 0

c  0+1 --> 1
c    (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧  p_696) -> (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0)
c  in CNF:
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_2
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_1
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨  b^{58, 13}_0
c  in DIMACS:
 17423  17424  17425 -696 -17426 0
 17423  17424  17425 -696 -17427 0
 17423  17424  17425 -696  17428 0

c  1+1 --> 2
c    (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0 ∧  p_696) -> (-b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0)
c  in CNF:
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_2
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨  b^{58, 13}_1
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ -p_696 ∨ -b^{58, 13}_0
c  in DIMACS:
 17423  17424 -17425 -696 -17426 0
 17423  17424 -17425 -696  17427 0
 17423  17424 -17425 -696 -17428 0

c  2+1 --> break 
c    (-b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧  p_696) -> break
c  in CNF:
c     b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 17423 -17424  17425 -696 1162 0


c  2-1 --> 1
c    (-b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧ -p_696) -> (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0)
c  in CNF:
c     b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_2
c     b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_1
c     b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨  b^{58, 13}_0
c  in DIMACS:
 17423 -17424  17425  696 -17426 0
 17423 -17424  17425  696 -17427 0
 17423 -17424  17425  696  17428 0

c  1-1 --> 0
c    (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0 ∧ -p_696) -> (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧ -b^{58, 13}_0)
c  in CNF:
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_2
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_1
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_0
c  in DIMACS:
 17423  17424 -17425  696 -17426 0
 17423  17424 -17425  696 -17427 0
 17423  17424 -17425  696 -17428 0

c  0-1 --> -1
c    (-b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧ -p_696) -> ( b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0)
c  in CNF:
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨  b^{58, 13}_2
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_1
c     b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨  b^{58, 13}_0
c  in DIMACS:
 17423  17424  17425  696  17426 0
 17423  17424  17425  696 -17427 0
 17423  17424  17425  696  17428 0

c  -1-1 --> -2
c    ( b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧  b^{58, 12}_0 ∧ -p_696) -> ( b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0)
c  in CNF:
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨  b^{58, 13}_2
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨  b^{58, 13}_1
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨  p_696 ∨ -b^{58, 13}_0
c  in DIMACS:
-17423  17424 -17425  696  17426 0
-17423  17424 -17425  696  17427 0
-17423  17424 -17425  696 -17428 0

c  -2-1 --> break 
c    ( b^{58, 12}_2 ∧  b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨  b^{58, 12}_0 ∨  p_696 ∨ break
c  in DIMACS:
-17423 -17424  17425  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 12}_2 ∧ -b^{58, 12}_1 ∧ -b^{58, 12}_0 ∧ true) 
c  in CNF:
c    -b^{58, 12}_2 ∨  b^{58, 12}_1 ∨  b^{58, 12}_0 ∨ false 
c  in DIMACS:
-17423  17424  17425  0

c  3 does not represent an automaton state.
c    -(-b^{58, 12}_2 ∧  b^{58, 12}_1 ∧  b^{58, 12}_0 ∧ true) 
c  in CNF:
c     b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ false 
c  in DIMACS:
 17423 -17424 -17425  0
c  -3 does not represent an automaton state.
c    -( b^{58, 12}_2 ∧  b^{58, 12}_1 ∧  b^{58, 12}_0 ∧ true) 
c  in CNF:
c    -b^{58, 12}_2 ∨ -b^{58, 12}_1 ∨ -b^{58, 12}_0 ∨ false 
c  in DIMACS:
-17423 -17424 -17425  0

c i = 13
c  -2+1 --> -1
c    ( b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧  p_754) -> ( b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0)
c  in CNF:
c    -b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨  b^{58, 14}_2
c    -b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_1
c    -b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨  b^{58, 14}_0
c  in DIMACS:
-17426 -17427  17428 -754  17429 0
-17426 -17427  17428 -754 -17430 0
-17426 -17427  17428 -754  17431 0

c  -1+1 --> 0
c    ( b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0 ∧  p_754) -> (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧ -b^{58, 14}_0)
c  in CNF:
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_2
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_1
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_0
c  in DIMACS:
-17426  17427 -17428 -754 -17429 0
-17426  17427 -17428 -754 -17430 0
-17426  17427 -17428 -754 -17431 0

c  0+1 --> 1
c    (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧  p_754) -> (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0)
c  in CNF:
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_2
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_1
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨  b^{58, 14}_0
c  in DIMACS:
 17426  17427  17428 -754 -17429 0
 17426  17427  17428 -754 -17430 0
 17426  17427  17428 -754  17431 0

c  1+1 --> 2
c    (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0 ∧  p_754) -> (-b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0)
c  in CNF:
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_2
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨  b^{58, 14}_1
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ -p_754 ∨ -b^{58, 14}_0
c  in DIMACS:
 17426  17427 -17428 -754 -17429 0
 17426  17427 -17428 -754  17430 0
 17426  17427 -17428 -754 -17431 0

c  2+1 --> break 
c    (-b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧  p_754) -> break
c  in CNF:
c     b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 17426 -17427  17428 -754 1162 0


c  2-1 --> 1
c    (-b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧ -p_754) -> (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0)
c  in CNF:
c     b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_2
c     b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_1
c     b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨  b^{58, 14}_0
c  in DIMACS:
 17426 -17427  17428  754 -17429 0
 17426 -17427  17428  754 -17430 0
 17426 -17427  17428  754  17431 0

c  1-1 --> 0
c    (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0 ∧ -p_754) -> (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧ -b^{58, 14}_0)
c  in CNF:
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_2
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_1
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_0
c  in DIMACS:
 17426  17427 -17428  754 -17429 0
 17426  17427 -17428  754 -17430 0
 17426  17427 -17428  754 -17431 0

c  0-1 --> -1
c    (-b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧ -p_754) -> ( b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0)
c  in CNF:
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨  b^{58, 14}_2
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_1
c     b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨  b^{58, 14}_0
c  in DIMACS:
 17426  17427  17428  754  17429 0
 17426  17427  17428  754 -17430 0
 17426  17427  17428  754  17431 0

c  -1-1 --> -2
c    ( b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧  b^{58, 13}_0 ∧ -p_754) -> ( b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0)
c  in CNF:
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨  b^{58, 14}_2
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨  b^{58, 14}_1
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨  p_754 ∨ -b^{58, 14}_0
c  in DIMACS:
-17426  17427 -17428  754  17429 0
-17426  17427 -17428  754  17430 0
-17426  17427 -17428  754 -17431 0

c  -2-1 --> break 
c    ( b^{58, 13}_2 ∧  b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨  b^{58, 13}_0 ∨  p_754 ∨ break
c  in DIMACS:
-17426 -17427  17428  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 13}_2 ∧ -b^{58, 13}_1 ∧ -b^{58, 13}_0 ∧ true) 
c  in CNF:
c    -b^{58, 13}_2 ∨  b^{58, 13}_1 ∨  b^{58, 13}_0 ∨ false 
c  in DIMACS:
-17426  17427  17428  0

c  3 does not represent an automaton state.
c    -(-b^{58, 13}_2 ∧  b^{58, 13}_1 ∧  b^{58, 13}_0 ∧ true) 
c  in CNF:
c     b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ false 
c  in DIMACS:
 17426 -17427 -17428  0
c  -3 does not represent an automaton state.
c    -( b^{58, 13}_2 ∧  b^{58, 13}_1 ∧  b^{58, 13}_0 ∧ true) 
c  in CNF:
c    -b^{58, 13}_2 ∨ -b^{58, 13}_1 ∨ -b^{58, 13}_0 ∨ false 
c  in DIMACS:
-17426 -17427 -17428  0

c i = 14
c  -2+1 --> -1
c    ( b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧  p_812) -> ( b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0)
c  in CNF:
c    -b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨  b^{58, 15}_2
c    -b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_1
c    -b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨  b^{58, 15}_0
c  in DIMACS:
-17429 -17430  17431 -812  17432 0
-17429 -17430  17431 -812 -17433 0
-17429 -17430  17431 -812  17434 0

c  -1+1 --> 0
c    ( b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0 ∧  p_812) -> (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧ -b^{58, 15}_0)
c  in CNF:
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_2
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_1
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_0
c  in DIMACS:
-17429  17430 -17431 -812 -17432 0
-17429  17430 -17431 -812 -17433 0
-17429  17430 -17431 -812 -17434 0

c  0+1 --> 1
c    (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧  p_812) -> (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0)
c  in CNF:
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_2
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_1
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨  b^{58, 15}_0
c  in DIMACS:
 17429  17430  17431 -812 -17432 0
 17429  17430  17431 -812 -17433 0
 17429  17430  17431 -812  17434 0

c  1+1 --> 2
c    (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0 ∧  p_812) -> (-b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0)
c  in CNF:
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_2
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨  b^{58, 15}_1
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ -p_812 ∨ -b^{58, 15}_0
c  in DIMACS:
 17429  17430 -17431 -812 -17432 0
 17429  17430 -17431 -812  17433 0
 17429  17430 -17431 -812 -17434 0

c  2+1 --> break 
c    (-b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧  p_812) -> break
c  in CNF:
c     b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 17429 -17430  17431 -812 1162 0


c  2-1 --> 1
c    (-b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧ -p_812) -> (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0)
c  in CNF:
c     b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_2
c     b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_1
c     b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨  b^{58, 15}_0
c  in DIMACS:
 17429 -17430  17431  812 -17432 0
 17429 -17430  17431  812 -17433 0
 17429 -17430  17431  812  17434 0

c  1-1 --> 0
c    (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0 ∧ -p_812) -> (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧ -b^{58, 15}_0)
c  in CNF:
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_2
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_1
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_0
c  in DIMACS:
 17429  17430 -17431  812 -17432 0
 17429  17430 -17431  812 -17433 0
 17429  17430 -17431  812 -17434 0

c  0-1 --> -1
c    (-b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧ -p_812) -> ( b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0)
c  in CNF:
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨  b^{58, 15}_2
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_1
c     b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨  b^{58, 15}_0
c  in DIMACS:
 17429  17430  17431  812  17432 0
 17429  17430  17431  812 -17433 0
 17429  17430  17431  812  17434 0

c  -1-1 --> -2
c    ( b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧  b^{58, 14}_0 ∧ -p_812) -> ( b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0)
c  in CNF:
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨  b^{58, 15}_2
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨  b^{58, 15}_1
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨  p_812 ∨ -b^{58, 15}_0
c  in DIMACS:
-17429  17430 -17431  812  17432 0
-17429  17430 -17431  812  17433 0
-17429  17430 -17431  812 -17434 0

c  -2-1 --> break 
c    ( b^{58, 14}_2 ∧  b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨  b^{58, 14}_0 ∨  p_812 ∨ break
c  in DIMACS:
-17429 -17430  17431  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 14}_2 ∧ -b^{58, 14}_1 ∧ -b^{58, 14}_0 ∧ true) 
c  in CNF:
c    -b^{58, 14}_2 ∨  b^{58, 14}_1 ∨  b^{58, 14}_0 ∨ false 
c  in DIMACS:
-17429  17430  17431  0

c  3 does not represent an automaton state.
c    -(-b^{58, 14}_2 ∧  b^{58, 14}_1 ∧  b^{58, 14}_0 ∧ true) 
c  in CNF:
c     b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ false 
c  in DIMACS:
 17429 -17430 -17431  0
c  -3 does not represent an automaton state.
c    -( b^{58, 14}_2 ∧  b^{58, 14}_1 ∧  b^{58, 14}_0 ∧ true) 
c  in CNF:
c    -b^{58, 14}_2 ∨ -b^{58, 14}_1 ∨ -b^{58, 14}_0 ∨ false 
c  in DIMACS:
-17429 -17430 -17431  0

c i = 15
c  -2+1 --> -1
c    ( b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧  p_870) -> ( b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0)
c  in CNF:
c    -b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨  b^{58, 16}_2
c    -b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_1
c    -b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨  b^{58, 16}_0
c  in DIMACS:
-17432 -17433  17434 -870  17435 0
-17432 -17433  17434 -870 -17436 0
-17432 -17433  17434 -870  17437 0

c  -1+1 --> 0
c    ( b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0 ∧  p_870) -> (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧ -b^{58, 16}_0)
c  in CNF:
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_2
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_1
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_0
c  in DIMACS:
-17432  17433 -17434 -870 -17435 0
-17432  17433 -17434 -870 -17436 0
-17432  17433 -17434 -870 -17437 0

c  0+1 --> 1
c    (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧  p_870) -> (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0)
c  in CNF:
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_2
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_1
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨  b^{58, 16}_0
c  in DIMACS:
 17432  17433  17434 -870 -17435 0
 17432  17433  17434 -870 -17436 0
 17432  17433  17434 -870  17437 0

c  1+1 --> 2
c    (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0 ∧  p_870) -> (-b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0)
c  in CNF:
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_2
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨  b^{58, 16}_1
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ -p_870 ∨ -b^{58, 16}_0
c  in DIMACS:
 17432  17433 -17434 -870 -17435 0
 17432  17433 -17434 -870  17436 0
 17432  17433 -17434 -870 -17437 0

c  2+1 --> break 
c    (-b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧  p_870) -> break
c  in CNF:
c     b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 17432 -17433  17434 -870 1162 0


c  2-1 --> 1
c    (-b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧ -p_870) -> (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0)
c  in CNF:
c     b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_2
c     b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_1
c     b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨  b^{58, 16}_0
c  in DIMACS:
 17432 -17433  17434  870 -17435 0
 17432 -17433  17434  870 -17436 0
 17432 -17433  17434  870  17437 0

c  1-1 --> 0
c    (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0 ∧ -p_870) -> (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧ -b^{58, 16}_0)
c  in CNF:
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_2
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_1
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_0
c  in DIMACS:
 17432  17433 -17434  870 -17435 0
 17432  17433 -17434  870 -17436 0
 17432  17433 -17434  870 -17437 0

c  0-1 --> -1
c    (-b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧ -p_870) -> ( b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0)
c  in CNF:
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨  b^{58, 16}_2
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_1
c     b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨  b^{58, 16}_0
c  in DIMACS:
 17432  17433  17434  870  17435 0
 17432  17433  17434  870 -17436 0
 17432  17433  17434  870  17437 0

c  -1-1 --> -2
c    ( b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧  b^{58, 15}_0 ∧ -p_870) -> ( b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0)
c  in CNF:
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨  b^{58, 16}_2
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨  b^{58, 16}_1
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨  p_870 ∨ -b^{58, 16}_0
c  in DIMACS:
-17432  17433 -17434  870  17435 0
-17432  17433 -17434  870  17436 0
-17432  17433 -17434  870 -17437 0

c  -2-1 --> break 
c    ( b^{58, 15}_2 ∧  b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨  b^{58, 15}_0 ∨  p_870 ∨ break
c  in DIMACS:
-17432 -17433  17434  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 15}_2 ∧ -b^{58, 15}_1 ∧ -b^{58, 15}_0 ∧ true) 
c  in CNF:
c    -b^{58, 15}_2 ∨  b^{58, 15}_1 ∨  b^{58, 15}_0 ∨ false 
c  in DIMACS:
-17432  17433  17434  0

c  3 does not represent an automaton state.
c    -(-b^{58, 15}_2 ∧  b^{58, 15}_1 ∧  b^{58, 15}_0 ∧ true) 
c  in CNF:
c     b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ false 
c  in DIMACS:
 17432 -17433 -17434  0
c  -3 does not represent an automaton state.
c    -( b^{58, 15}_2 ∧  b^{58, 15}_1 ∧  b^{58, 15}_0 ∧ true) 
c  in CNF:
c    -b^{58, 15}_2 ∨ -b^{58, 15}_1 ∨ -b^{58, 15}_0 ∨ false 
c  in DIMACS:
-17432 -17433 -17434  0

c i = 16
c  -2+1 --> -1
c    ( b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧  p_928) -> ( b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0)
c  in CNF:
c    -b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨  b^{58, 17}_2
c    -b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_1
c    -b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨  b^{58, 17}_0
c  in DIMACS:
-17435 -17436  17437 -928  17438 0
-17435 -17436  17437 -928 -17439 0
-17435 -17436  17437 -928  17440 0

c  -1+1 --> 0
c    ( b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0 ∧  p_928) -> (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧ -b^{58, 17}_0)
c  in CNF:
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_2
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_1
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_0
c  in DIMACS:
-17435  17436 -17437 -928 -17438 0
-17435  17436 -17437 -928 -17439 0
-17435  17436 -17437 -928 -17440 0

c  0+1 --> 1
c    (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧  p_928) -> (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0)
c  in CNF:
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_2
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_1
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨  b^{58, 17}_0
c  in DIMACS:
 17435  17436  17437 -928 -17438 0
 17435  17436  17437 -928 -17439 0
 17435  17436  17437 -928  17440 0

c  1+1 --> 2
c    (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0 ∧  p_928) -> (-b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0)
c  in CNF:
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_2
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨  b^{58, 17}_1
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ -p_928 ∨ -b^{58, 17}_0
c  in DIMACS:
 17435  17436 -17437 -928 -17438 0
 17435  17436 -17437 -928  17439 0
 17435  17436 -17437 -928 -17440 0

c  2+1 --> break 
c    (-b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧  p_928) -> break
c  in CNF:
c     b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 17435 -17436  17437 -928 1162 0


c  2-1 --> 1
c    (-b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧ -p_928) -> (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0)
c  in CNF:
c     b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_2
c     b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_1
c     b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨  b^{58, 17}_0
c  in DIMACS:
 17435 -17436  17437  928 -17438 0
 17435 -17436  17437  928 -17439 0
 17435 -17436  17437  928  17440 0

c  1-1 --> 0
c    (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0 ∧ -p_928) -> (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧ -b^{58, 17}_0)
c  in CNF:
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_2
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_1
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_0
c  in DIMACS:
 17435  17436 -17437  928 -17438 0
 17435  17436 -17437  928 -17439 0
 17435  17436 -17437  928 -17440 0

c  0-1 --> -1
c    (-b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧ -p_928) -> ( b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0)
c  in CNF:
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨  b^{58, 17}_2
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_1
c     b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨  b^{58, 17}_0
c  in DIMACS:
 17435  17436  17437  928  17438 0
 17435  17436  17437  928 -17439 0
 17435  17436  17437  928  17440 0

c  -1-1 --> -2
c    ( b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧  b^{58, 16}_0 ∧ -p_928) -> ( b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0)
c  in CNF:
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨  b^{58, 17}_2
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨  b^{58, 17}_1
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨  p_928 ∨ -b^{58, 17}_0
c  in DIMACS:
-17435  17436 -17437  928  17438 0
-17435  17436 -17437  928  17439 0
-17435  17436 -17437  928 -17440 0

c  -2-1 --> break 
c    ( b^{58, 16}_2 ∧  b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨  b^{58, 16}_0 ∨  p_928 ∨ break
c  in DIMACS:
-17435 -17436  17437  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 16}_2 ∧ -b^{58, 16}_1 ∧ -b^{58, 16}_0 ∧ true) 
c  in CNF:
c    -b^{58, 16}_2 ∨  b^{58, 16}_1 ∨  b^{58, 16}_0 ∨ false 
c  in DIMACS:
-17435  17436  17437  0

c  3 does not represent an automaton state.
c    -(-b^{58, 16}_2 ∧  b^{58, 16}_1 ∧  b^{58, 16}_0 ∧ true) 
c  in CNF:
c     b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ false 
c  in DIMACS:
 17435 -17436 -17437  0
c  -3 does not represent an automaton state.
c    -( b^{58, 16}_2 ∧  b^{58, 16}_1 ∧  b^{58, 16}_0 ∧ true) 
c  in CNF:
c    -b^{58, 16}_2 ∨ -b^{58, 16}_1 ∨ -b^{58, 16}_0 ∨ false 
c  in DIMACS:
-17435 -17436 -17437  0

c i = 17
c  -2+1 --> -1
c    ( b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧  p_986) -> ( b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0)
c  in CNF:
c    -b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨  b^{58, 18}_2
c    -b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_1
c    -b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨  b^{58, 18}_0
c  in DIMACS:
-17438 -17439  17440 -986  17441 0
-17438 -17439  17440 -986 -17442 0
-17438 -17439  17440 -986  17443 0

c  -1+1 --> 0
c    ( b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0 ∧  p_986) -> (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧ -b^{58, 18}_0)
c  in CNF:
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_2
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_1
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_0
c  in DIMACS:
-17438  17439 -17440 -986 -17441 0
-17438  17439 -17440 -986 -17442 0
-17438  17439 -17440 -986 -17443 0

c  0+1 --> 1
c    (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧  p_986) -> (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0)
c  in CNF:
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_2
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_1
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨  b^{58, 18}_0
c  in DIMACS:
 17438  17439  17440 -986 -17441 0
 17438  17439  17440 -986 -17442 0
 17438  17439  17440 -986  17443 0

c  1+1 --> 2
c    (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0 ∧  p_986) -> (-b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0)
c  in CNF:
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_2
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨  b^{58, 18}_1
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ -p_986 ∨ -b^{58, 18}_0
c  in DIMACS:
 17438  17439 -17440 -986 -17441 0
 17438  17439 -17440 -986  17442 0
 17438  17439 -17440 -986 -17443 0

c  2+1 --> break 
c    (-b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧  p_986) -> break
c  in CNF:
c     b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ -p_986 ∨ break
c  in DIMACS:
 17438 -17439  17440 -986 1162 0


c  2-1 --> 1
c    (-b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧ -p_986) -> (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0)
c  in CNF:
c     b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_2
c     b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_1
c     b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨  b^{58, 18}_0
c  in DIMACS:
 17438 -17439  17440  986 -17441 0
 17438 -17439  17440  986 -17442 0
 17438 -17439  17440  986  17443 0

c  1-1 --> 0
c    (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0 ∧ -p_986) -> (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧ -b^{58, 18}_0)
c  in CNF:
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_2
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_1
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_0
c  in DIMACS:
 17438  17439 -17440  986 -17441 0
 17438  17439 -17440  986 -17442 0
 17438  17439 -17440  986 -17443 0

c  0-1 --> -1
c    (-b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧ -p_986) -> ( b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0)
c  in CNF:
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨  b^{58, 18}_2
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_1
c     b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨  b^{58, 18}_0
c  in DIMACS:
 17438  17439  17440  986  17441 0
 17438  17439  17440  986 -17442 0
 17438  17439  17440  986  17443 0

c  -1-1 --> -2
c    ( b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧  b^{58, 17}_0 ∧ -p_986) -> ( b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0)
c  in CNF:
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨  b^{58, 18}_2
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨  b^{58, 18}_1
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨  p_986 ∨ -b^{58, 18}_0
c  in DIMACS:
-17438  17439 -17440  986  17441 0
-17438  17439 -17440  986  17442 0
-17438  17439 -17440  986 -17443 0

c  -2-1 --> break 
c    ( b^{58, 17}_2 ∧  b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧ -p_986) -> break
c  in CNF:
c    -b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨  b^{58, 17}_0 ∨  p_986 ∨ break
c  in DIMACS:
-17438 -17439  17440  986 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 17}_2 ∧ -b^{58, 17}_1 ∧ -b^{58, 17}_0 ∧ true) 
c  in CNF:
c    -b^{58, 17}_2 ∨  b^{58, 17}_1 ∨  b^{58, 17}_0 ∨ false 
c  in DIMACS:
-17438  17439  17440  0

c  3 does not represent an automaton state.
c    -(-b^{58, 17}_2 ∧  b^{58, 17}_1 ∧  b^{58, 17}_0 ∧ true) 
c  in CNF:
c     b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ false 
c  in DIMACS:
 17438 -17439 -17440  0
c  -3 does not represent an automaton state.
c    -( b^{58, 17}_2 ∧  b^{58, 17}_1 ∧  b^{58, 17}_0 ∧ true) 
c  in CNF:
c    -b^{58, 17}_2 ∨ -b^{58, 17}_1 ∨ -b^{58, 17}_0 ∨ false 
c  in DIMACS:
-17438 -17439 -17440  0

c i = 18
c  -2+1 --> -1
c    ( b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧  p_1044) -> ( b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0)
c  in CNF:
c    -b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨  b^{58, 19}_2
c    -b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_1
c    -b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨  b^{58, 19}_0
c  in DIMACS:
-17441 -17442  17443 -1044  17444 0
-17441 -17442  17443 -1044 -17445 0
-17441 -17442  17443 -1044  17446 0

c  -1+1 --> 0
c    ( b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0 ∧  p_1044) -> (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧ -b^{58, 19}_0)
c  in CNF:
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_2
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_1
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_0
c  in DIMACS:
-17441  17442 -17443 -1044 -17444 0
-17441  17442 -17443 -1044 -17445 0
-17441  17442 -17443 -1044 -17446 0

c  0+1 --> 1
c    (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧  p_1044) -> (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0)
c  in CNF:
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_2
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_1
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨  b^{58, 19}_0
c  in DIMACS:
 17441  17442  17443 -1044 -17444 0
 17441  17442  17443 -1044 -17445 0
 17441  17442  17443 -1044  17446 0

c  1+1 --> 2
c    (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0 ∧  p_1044) -> (-b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0)
c  in CNF:
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_2
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨  b^{58, 19}_1
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ -p_1044 ∨ -b^{58, 19}_0
c  in DIMACS:
 17441  17442 -17443 -1044 -17444 0
 17441  17442 -17443 -1044  17445 0
 17441  17442 -17443 -1044 -17446 0

c  2+1 --> break 
c    (-b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 17441 -17442  17443 -1044 1162 0


c  2-1 --> 1
c    (-b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧ -p_1044) -> (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0)
c  in CNF:
c     b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_2
c     b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_1
c     b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨  b^{58, 19}_0
c  in DIMACS:
 17441 -17442  17443  1044 -17444 0
 17441 -17442  17443  1044 -17445 0
 17441 -17442  17443  1044  17446 0

c  1-1 --> 0
c    (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0 ∧ -p_1044) -> (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧ -b^{58, 19}_0)
c  in CNF:
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_2
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_1
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_0
c  in DIMACS:
 17441  17442 -17443  1044 -17444 0
 17441  17442 -17443  1044 -17445 0
 17441  17442 -17443  1044 -17446 0

c  0-1 --> -1
c    (-b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧ -p_1044) -> ( b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0)
c  in CNF:
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨  b^{58, 19}_2
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_1
c     b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨  b^{58, 19}_0
c  in DIMACS:
 17441  17442  17443  1044  17444 0
 17441  17442  17443  1044 -17445 0
 17441  17442  17443  1044  17446 0

c  -1-1 --> -2
c    ( b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧  b^{58, 18}_0 ∧ -p_1044) -> ( b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0)
c  in CNF:
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨  b^{58, 19}_2
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨  b^{58, 19}_1
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨  p_1044 ∨ -b^{58, 19}_0
c  in DIMACS:
-17441  17442 -17443  1044  17444 0
-17441  17442 -17443  1044  17445 0
-17441  17442 -17443  1044 -17446 0

c  -2-1 --> break 
c    ( b^{58, 18}_2 ∧  b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨  b^{58, 18}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-17441 -17442  17443  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 18}_2 ∧ -b^{58, 18}_1 ∧ -b^{58, 18}_0 ∧ true) 
c  in CNF:
c    -b^{58, 18}_2 ∨  b^{58, 18}_1 ∨  b^{58, 18}_0 ∨ false 
c  in DIMACS:
-17441  17442  17443  0

c  3 does not represent an automaton state.
c    -(-b^{58, 18}_2 ∧  b^{58, 18}_1 ∧  b^{58, 18}_0 ∧ true) 
c  in CNF:
c     b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ false 
c  in DIMACS:
 17441 -17442 -17443  0
c  -3 does not represent an automaton state.
c    -( b^{58, 18}_2 ∧  b^{58, 18}_1 ∧  b^{58, 18}_0 ∧ true) 
c  in CNF:
c    -b^{58, 18}_2 ∨ -b^{58, 18}_1 ∨ -b^{58, 18}_0 ∨ false 
c  in DIMACS:
-17441 -17442 -17443  0

c i = 19
c  -2+1 --> -1
c    ( b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧  p_1102) -> ( b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0)
c  in CNF:
c    -b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨  b^{58, 20}_2
c    -b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_1
c    -b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨  b^{58, 20}_0
c  in DIMACS:
-17444 -17445  17446 -1102  17447 0
-17444 -17445  17446 -1102 -17448 0
-17444 -17445  17446 -1102  17449 0

c  -1+1 --> 0
c    ( b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0 ∧  p_1102) -> (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧ -b^{58, 20}_0)
c  in CNF:
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_2
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_1
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_0
c  in DIMACS:
-17444  17445 -17446 -1102 -17447 0
-17444  17445 -17446 -1102 -17448 0
-17444  17445 -17446 -1102 -17449 0

c  0+1 --> 1
c    (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧  p_1102) -> (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0)
c  in CNF:
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_2
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_1
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨  b^{58, 20}_0
c  in DIMACS:
 17444  17445  17446 -1102 -17447 0
 17444  17445  17446 -1102 -17448 0
 17444  17445  17446 -1102  17449 0

c  1+1 --> 2
c    (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0 ∧  p_1102) -> (-b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0)
c  in CNF:
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_2
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨  b^{58, 20}_1
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ -p_1102 ∨ -b^{58, 20}_0
c  in DIMACS:
 17444  17445 -17446 -1102 -17447 0
 17444  17445 -17446 -1102  17448 0
 17444  17445 -17446 -1102 -17449 0

c  2+1 --> break 
c    (-b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧  p_1102) -> break
c  in CNF:
c     b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ -p_1102 ∨ break
c  in DIMACS:
 17444 -17445  17446 -1102 1162 0


c  2-1 --> 1
c    (-b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧ -p_1102) -> (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0)
c  in CNF:
c     b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_2
c     b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_1
c     b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨  b^{58, 20}_0
c  in DIMACS:
 17444 -17445  17446  1102 -17447 0
 17444 -17445  17446  1102 -17448 0
 17444 -17445  17446  1102  17449 0

c  1-1 --> 0
c    (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0 ∧ -p_1102) -> (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧ -b^{58, 20}_0)
c  in CNF:
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_2
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_1
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_0
c  in DIMACS:
 17444  17445 -17446  1102 -17447 0
 17444  17445 -17446  1102 -17448 0
 17444  17445 -17446  1102 -17449 0

c  0-1 --> -1
c    (-b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧ -p_1102) -> ( b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0)
c  in CNF:
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨  b^{58, 20}_2
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_1
c     b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨  b^{58, 20}_0
c  in DIMACS:
 17444  17445  17446  1102  17447 0
 17444  17445  17446  1102 -17448 0
 17444  17445  17446  1102  17449 0

c  -1-1 --> -2
c    ( b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧  b^{58, 19}_0 ∧ -p_1102) -> ( b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0)
c  in CNF:
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨  b^{58, 20}_2
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨  b^{58, 20}_1
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨  p_1102 ∨ -b^{58, 20}_0
c  in DIMACS:
-17444  17445 -17446  1102  17447 0
-17444  17445 -17446  1102  17448 0
-17444  17445 -17446  1102 -17449 0

c  -2-1 --> break 
c    ( b^{58, 19}_2 ∧  b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧ -p_1102) -> break
c  in CNF:
c    -b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨  b^{58, 19}_0 ∨  p_1102 ∨ break
c  in DIMACS:
-17444 -17445  17446  1102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 19}_2 ∧ -b^{58, 19}_1 ∧ -b^{58, 19}_0 ∧ true) 
c  in CNF:
c    -b^{58, 19}_2 ∨  b^{58, 19}_1 ∨  b^{58, 19}_0 ∨ false 
c  in DIMACS:
-17444  17445  17446  0

c  3 does not represent an automaton state.
c    -(-b^{58, 19}_2 ∧  b^{58, 19}_1 ∧  b^{58, 19}_0 ∧ true) 
c  in CNF:
c     b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ false 
c  in DIMACS:
 17444 -17445 -17446  0
c  -3 does not represent an automaton state.
c    -( b^{58, 19}_2 ∧  b^{58, 19}_1 ∧  b^{58, 19}_0 ∧ true) 
c  in CNF:
c    -b^{58, 19}_2 ∨ -b^{58, 19}_1 ∨ -b^{58, 19}_0 ∨ false 
c  in DIMACS:
-17444 -17445 -17446  0

c i = 20
c  -2+1 --> -1
c    ( b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧  p_1160) -> ( b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧  b^{58, 21}_0)
c  in CNF:
c    -b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨  b^{58, 21}_2
c    -b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_1
c    -b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨  b^{58, 21}_0
c  in DIMACS:
-17447 -17448  17449 -1160  17450 0
-17447 -17448  17449 -1160 -17451 0
-17447 -17448  17449 -1160  17452 0

c  -1+1 --> 0
c    ( b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0 ∧  p_1160) -> (-b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧ -b^{58, 21}_0)
c  in CNF:
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_2
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_1
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_0
c  in DIMACS:
-17447  17448 -17449 -1160 -17450 0
-17447  17448 -17449 -1160 -17451 0
-17447  17448 -17449 -1160 -17452 0

c  0+1 --> 1
c    (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧  p_1160) -> (-b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧  b^{58, 21}_0)
c  in CNF:
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_2
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_1
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨  b^{58, 21}_0
c  in DIMACS:
 17447  17448  17449 -1160 -17450 0
 17447  17448  17449 -1160 -17451 0
 17447  17448  17449 -1160  17452 0

c  1+1 --> 2
c    (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0 ∧  p_1160) -> (-b^{58, 21}_2 ∧  b^{58, 21}_1 ∧ -b^{58, 21}_0)
c  in CNF:
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_2
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨  b^{58, 21}_1
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ -p_1160 ∨ -b^{58, 21}_0
c  in DIMACS:
 17447  17448 -17449 -1160 -17450 0
 17447  17448 -17449 -1160  17451 0
 17447  17448 -17449 -1160 -17452 0

c  2+1 --> break 
c    (-b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 17447 -17448  17449 -1160 1162 0


c  2-1 --> 1
c    (-b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧ -p_1160) -> (-b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧  b^{58, 21}_0)
c  in CNF:
c     b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_2
c     b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_1
c     b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨  b^{58, 21}_0
c  in DIMACS:
 17447 -17448  17449  1160 -17450 0
 17447 -17448  17449  1160 -17451 0
 17447 -17448  17449  1160  17452 0

c  1-1 --> 0
c    (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0 ∧ -p_1160) -> (-b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧ -b^{58, 21}_0)
c  in CNF:
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_2
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_1
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_0
c  in DIMACS:
 17447  17448 -17449  1160 -17450 0
 17447  17448 -17449  1160 -17451 0
 17447  17448 -17449  1160 -17452 0

c  0-1 --> -1
c    (-b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧ -p_1160) -> ( b^{58, 21}_2 ∧ -b^{58, 21}_1 ∧  b^{58, 21}_0)
c  in CNF:
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨  b^{58, 21}_2
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_1
c     b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨  b^{58, 21}_0
c  in DIMACS:
 17447  17448  17449  1160  17450 0
 17447  17448  17449  1160 -17451 0
 17447  17448  17449  1160  17452 0

c  -1-1 --> -2
c    ( b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧  b^{58, 20}_0 ∧ -p_1160) -> ( b^{58, 21}_2 ∧  b^{58, 21}_1 ∧ -b^{58, 21}_0)
c  in CNF:
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨  b^{58, 21}_2
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨  b^{58, 21}_1
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨  p_1160 ∨ -b^{58, 21}_0
c  in DIMACS:
-17447  17448 -17449  1160  17450 0
-17447  17448 -17449  1160  17451 0
-17447  17448 -17449  1160 -17452 0

c  -2-1 --> break 
c    ( b^{58, 20}_2 ∧  b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨  b^{58, 20}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-17447 -17448  17449  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{58, 20}_2 ∧ -b^{58, 20}_1 ∧ -b^{58, 20}_0 ∧ true) 
c  in CNF:
c    -b^{58, 20}_2 ∨  b^{58, 20}_1 ∨  b^{58, 20}_0 ∨ false 
c  in DIMACS:
-17447  17448  17449  0

c  3 does not represent an automaton state.
c    -(-b^{58, 20}_2 ∧  b^{58, 20}_1 ∧  b^{58, 20}_0 ∧ true) 
c  in CNF:
c     b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ false 
c  in DIMACS:
 17447 -17448 -17449  0
c  -3 does not represent an automaton state.
c    -( b^{58, 20}_2 ∧  b^{58, 20}_1 ∧  b^{58, 20}_0 ∧ true) 
c  in CNF:
c    -b^{58, 20}_2 ∨ -b^{58, 20}_1 ∨ -b^{58, 20}_0 ∨ false 
c  in DIMACS:
-17447 -17448 -17449  0

c INIT for k = 59
c    -b^{59, 1}_2
c    -b^{59, 1}_1
c    -b^{59, 1}_0
c  in DIMACS:
-17453 0
-17454 0
-17455 0

c Transitions for k = 59
c i = 1
c  -2+1 --> -1
c    ( b^{59, 1}_2 ∧  b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧  p_59) -> ( b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0)
c  in CNF:
c    -b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨  b^{59, 2}_2
c    -b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_1
c    -b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨  b^{59, 2}_0
c  in DIMACS:
-17453 -17454  17455 -59  17456 0
-17453 -17454  17455 -59 -17457 0
-17453 -17454  17455 -59  17458 0

c  -1+1 --> 0
c    ( b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧  b^{59, 1}_0 ∧  p_59) -> (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧ -b^{59, 2}_0)
c  in CNF:
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_2
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_1
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_0
c  in DIMACS:
-17453  17454 -17455 -59 -17456 0
-17453  17454 -17455 -59 -17457 0
-17453  17454 -17455 -59 -17458 0

c  0+1 --> 1
c    (-b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧  p_59) -> (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0)
c  in CNF:
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_2
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_1
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨  b^{59, 2}_0
c  in DIMACS:
 17453  17454  17455 -59 -17456 0
 17453  17454  17455 -59 -17457 0
 17453  17454  17455 -59  17458 0

c  1+1 --> 2
c    (-b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧  b^{59, 1}_0 ∧  p_59) -> (-b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0)
c  in CNF:
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_2
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨  b^{59, 2}_1
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ -p_59 ∨ -b^{59, 2}_0
c  in DIMACS:
 17453  17454 -17455 -59 -17456 0
 17453  17454 -17455 -59  17457 0
 17453  17454 -17455 -59 -17458 0

c  2+1 --> break 
c    (-b^{59, 1}_2 ∧  b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧  p_59) -> break
c  in CNF:
c     b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ -p_59 ∨ break
c  in DIMACS:
 17453 -17454  17455 -59 1162 0


c  2-1 --> 1
c    (-b^{59, 1}_2 ∧  b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧ -p_59) -> (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0)
c  in CNF:
c     b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_2
c     b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_1
c     b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨  b^{59, 2}_0
c  in DIMACS:
 17453 -17454  17455  59 -17456 0
 17453 -17454  17455  59 -17457 0
 17453 -17454  17455  59  17458 0

c  1-1 --> 0
c    (-b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧  b^{59, 1}_0 ∧ -p_59) -> (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧ -b^{59, 2}_0)
c  in CNF:
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_2
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_1
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_0
c  in DIMACS:
 17453  17454 -17455  59 -17456 0
 17453  17454 -17455  59 -17457 0
 17453  17454 -17455  59 -17458 0

c  0-1 --> -1
c    (-b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧ -p_59) -> ( b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0)
c  in CNF:
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨  b^{59, 2}_2
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_1
c     b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨  b^{59, 2}_0
c  in DIMACS:
 17453  17454  17455  59  17456 0
 17453  17454  17455  59 -17457 0
 17453  17454  17455  59  17458 0

c  -1-1 --> -2
c    ( b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧  b^{59, 1}_0 ∧ -p_59) -> ( b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0)
c  in CNF:
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨  b^{59, 2}_2
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨  b^{59, 2}_1
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨  p_59 ∨ -b^{59, 2}_0
c  in DIMACS:
-17453  17454 -17455  59  17456 0
-17453  17454 -17455  59  17457 0
-17453  17454 -17455  59 -17458 0

c  -2-1 --> break 
c    ( b^{59, 1}_2 ∧  b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧ -p_59) -> break
c  in CNF:
c    -b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨  b^{59, 1}_0 ∨  p_59 ∨ break
c  in DIMACS:
-17453 -17454  17455  59 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 1}_2 ∧ -b^{59, 1}_1 ∧ -b^{59, 1}_0 ∧ true) 
c  in CNF:
c    -b^{59, 1}_2 ∨  b^{59, 1}_1 ∨  b^{59, 1}_0 ∨ false 
c  in DIMACS:
-17453  17454  17455  0

c  3 does not represent an automaton state.
c    -(-b^{59, 1}_2 ∧  b^{59, 1}_1 ∧  b^{59, 1}_0 ∧ true) 
c  in CNF:
c     b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ false 
c  in DIMACS:
 17453 -17454 -17455  0
c  -3 does not represent an automaton state.
c    -( b^{59, 1}_2 ∧  b^{59, 1}_1 ∧  b^{59, 1}_0 ∧ true) 
c  in CNF:
c    -b^{59, 1}_2 ∨ -b^{59, 1}_1 ∨ -b^{59, 1}_0 ∨ false 
c  in DIMACS:
-17453 -17454 -17455  0

c i = 2
c  -2+1 --> -1
c    ( b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧  p_118) -> ( b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0)
c  in CNF:
c    -b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨  b^{59, 3}_2
c    -b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_1
c    -b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨  b^{59, 3}_0
c  in DIMACS:
-17456 -17457  17458 -118  17459 0
-17456 -17457  17458 -118 -17460 0
-17456 -17457  17458 -118  17461 0

c  -1+1 --> 0
c    ( b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0 ∧  p_118) -> (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧ -b^{59, 3}_0)
c  in CNF:
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_2
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_1
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_0
c  in DIMACS:
-17456  17457 -17458 -118 -17459 0
-17456  17457 -17458 -118 -17460 0
-17456  17457 -17458 -118 -17461 0

c  0+1 --> 1
c    (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧  p_118) -> (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0)
c  in CNF:
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_2
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_1
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨  b^{59, 3}_0
c  in DIMACS:
 17456  17457  17458 -118 -17459 0
 17456  17457  17458 -118 -17460 0
 17456  17457  17458 -118  17461 0

c  1+1 --> 2
c    (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0 ∧  p_118) -> (-b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0)
c  in CNF:
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_2
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨  b^{59, 3}_1
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ -p_118 ∨ -b^{59, 3}_0
c  in DIMACS:
 17456  17457 -17458 -118 -17459 0
 17456  17457 -17458 -118  17460 0
 17456  17457 -17458 -118 -17461 0

c  2+1 --> break 
c    (-b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧  p_118) -> break
c  in CNF:
c     b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ -p_118 ∨ break
c  in DIMACS:
 17456 -17457  17458 -118 1162 0


c  2-1 --> 1
c    (-b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧ -p_118) -> (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0)
c  in CNF:
c     b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_2
c     b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_1
c     b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨  b^{59, 3}_0
c  in DIMACS:
 17456 -17457  17458  118 -17459 0
 17456 -17457  17458  118 -17460 0
 17456 -17457  17458  118  17461 0

c  1-1 --> 0
c    (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0 ∧ -p_118) -> (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧ -b^{59, 3}_0)
c  in CNF:
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_2
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_1
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_0
c  in DIMACS:
 17456  17457 -17458  118 -17459 0
 17456  17457 -17458  118 -17460 0
 17456  17457 -17458  118 -17461 0

c  0-1 --> -1
c    (-b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧ -p_118) -> ( b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0)
c  in CNF:
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨  b^{59, 3}_2
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_1
c     b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨  b^{59, 3}_0
c  in DIMACS:
 17456  17457  17458  118  17459 0
 17456  17457  17458  118 -17460 0
 17456  17457  17458  118  17461 0

c  -1-1 --> -2
c    ( b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧  b^{59, 2}_0 ∧ -p_118) -> ( b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0)
c  in CNF:
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨  b^{59, 3}_2
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨  b^{59, 3}_1
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨  p_118 ∨ -b^{59, 3}_0
c  in DIMACS:
-17456  17457 -17458  118  17459 0
-17456  17457 -17458  118  17460 0
-17456  17457 -17458  118 -17461 0

c  -2-1 --> break 
c    ( b^{59, 2}_2 ∧  b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧ -p_118) -> break
c  in CNF:
c    -b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨  b^{59, 2}_0 ∨  p_118 ∨ break
c  in DIMACS:
-17456 -17457  17458  118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 2}_2 ∧ -b^{59, 2}_1 ∧ -b^{59, 2}_0 ∧ true) 
c  in CNF:
c    -b^{59, 2}_2 ∨  b^{59, 2}_1 ∨  b^{59, 2}_0 ∨ false 
c  in DIMACS:
-17456  17457  17458  0

c  3 does not represent an automaton state.
c    -(-b^{59, 2}_2 ∧  b^{59, 2}_1 ∧  b^{59, 2}_0 ∧ true) 
c  in CNF:
c     b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ false 
c  in DIMACS:
 17456 -17457 -17458  0
c  -3 does not represent an automaton state.
c    -( b^{59, 2}_2 ∧  b^{59, 2}_1 ∧  b^{59, 2}_0 ∧ true) 
c  in CNF:
c    -b^{59, 2}_2 ∨ -b^{59, 2}_1 ∨ -b^{59, 2}_0 ∨ false 
c  in DIMACS:
-17456 -17457 -17458  0

c i = 3
c  -2+1 --> -1
c    ( b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧  p_177) -> ( b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0)
c  in CNF:
c    -b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨  b^{59, 4}_2
c    -b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_1
c    -b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨  b^{59, 4}_0
c  in DIMACS:
-17459 -17460  17461 -177  17462 0
-17459 -17460  17461 -177 -17463 0
-17459 -17460  17461 -177  17464 0

c  -1+1 --> 0
c    ( b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0 ∧  p_177) -> (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧ -b^{59, 4}_0)
c  in CNF:
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_2
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_1
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_0
c  in DIMACS:
-17459  17460 -17461 -177 -17462 0
-17459  17460 -17461 -177 -17463 0
-17459  17460 -17461 -177 -17464 0

c  0+1 --> 1
c    (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧  p_177) -> (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0)
c  in CNF:
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_2
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_1
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨  b^{59, 4}_0
c  in DIMACS:
 17459  17460  17461 -177 -17462 0
 17459  17460  17461 -177 -17463 0
 17459  17460  17461 -177  17464 0

c  1+1 --> 2
c    (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0 ∧  p_177) -> (-b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0)
c  in CNF:
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_2
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨  b^{59, 4}_1
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ -p_177 ∨ -b^{59, 4}_0
c  in DIMACS:
 17459  17460 -17461 -177 -17462 0
 17459  17460 -17461 -177  17463 0
 17459  17460 -17461 -177 -17464 0

c  2+1 --> break 
c    (-b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧  p_177) -> break
c  in CNF:
c     b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ -p_177 ∨ break
c  in DIMACS:
 17459 -17460  17461 -177 1162 0


c  2-1 --> 1
c    (-b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧ -p_177) -> (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0)
c  in CNF:
c     b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_2
c     b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_1
c     b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨  b^{59, 4}_0
c  in DIMACS:
 17459 -17460  17461  177 -17462 0
 17459 -17460  17461  177 -17463 0
 17459 -17460  17461  177  17464 0

c  1-1 --> 0
c    (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0 ∧ -p_177) -> (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧ -b^{59, 4}_0)
c  in CNF:
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_2
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_1
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_0
c  in DIMACS:
 17459  17460 -17461  177 -17462 0
 17459  17460 -17461  177 -17463 0
 17459  17460 -17461  177 -17464 0

c  0-1 --> -1
c    (-b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧ -p_177) -> ( b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0)
c  in CNF:
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨  b^{59, 4}_2
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_1
c     b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨  b^{59, 4}_0
c  in DIMACS:
 17459  17460  17461  177  17462 0
 17459  17460  17461  177 -17463 0
 17459  17460  17461  177  17464 0

c  -1-1 --> -2
c    ( b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧  b^{59, 3}_0 ∧ -p_177) -> ( b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0)
c  in CNF:
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨  b^{59, 4}_2
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨  b^{59, 4}_1
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨  p_177 ∨ -b^{59, 4}_0
c  in DIMACS:
-17459  17460 -17461  177  17462 0
-17459  17460 -17461  177  17463 0
-17459  17460 -17461  177 -17464 0

c  -2-1 --> break 
c    ( b^{59, 3}_2 ∧  b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧ -p_177) -> break
c  in CNF:
c    -b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨  b^{59, 3}_0 ∨  p_177 ∨ break
c  in DIMACS:
-17459 -17460  17461  177 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 3}_2 ∧ -b^{59, 3}_1 ∧ -b^{59, 3}_0 ∧ true) 
c  in CNF:
c    -b^{59, 3}_2 ∨  b^{59, 3}_1 ∨  b^{59, 3}_0 ∨ false 
c  in DIMACS:
-17459  17460  17461  0

c  3 does not represent an automaton state.
c    -(-b^{59, 3}_2 ∧  b^{59, 3}_1 ∧  b^{59, 3}_0 ∧ true) 
c  in CNF:
c     b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ false 
c  in DIMACS:
 17459 -17460 -17461  0
c  -3 does not represent an automaton state.
c    -( b^{59, 3}_2 ∧  b^{59, 3}_1 ∧  b^{59, 3}_0 ∧ true) 
c  in CNF:
c    -b^{59, 3}_2 ∨ -b^{59, 3}_1 ∨ -b^{59, 3}_0 ∨ false 
c  in DIMACS:
-17459 -17460 -17461  0

c i = 4
c  -2+1 --> -1
c    ( b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧  p_236) -> ( b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0)
c  in CNF:
c    -b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨  b^{59, 5}_2
c    -b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_1
c    -b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨  b^{59, 5}_0
c  in DIMACS:
-17462 -17463  17464 -236  17465 0
-17462 -17463  17464 -236 -17466 0
-17462 -17463  17464 -236  17467 0

c  -1+1 --> 0
c    ( b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0 ∧  p_236) -> (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧ -b^{59, 5}_0)
c  in CNF:
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_2
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_1
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_0
c  in DIMACS:
-17462  17463 -17464 -236 -17465 0
-17462  17463 -17464 -236 -17466 0
-17462  17463 -17464 -236 -17467 0

c  0+1 --> 1
c    (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧  p_236) -> (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0)
c  in CNF:
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_2
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_1
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨  b^{59, 5}_0
c  in DIMACS:
 17462  17463  17464 -236 -17465 0
 17462  17463  17464 -236 -17466 0
 17462  17463  17464 -236  17467 0

c  1+1 --> 2
c    (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0 ∧  p_236) -> (-b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0)
c  in CNF:
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_2
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨  b^{59, 5}_1
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ -p_236 ∨ -b^{59, 5}_0
c  in DIMACS:
 17462  17463 -17464 -236 -17465 0
 17462  17463 -17464 -236  17466 0
 17462  17463 -17464 -236 -17467 0

c  2+1 --> break 
c    (-b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧  p_236) -> break
c  in CNF:
c     b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 17462 -17463  17464 -236 1162 0


c  2-1 --> 1
c    (-b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧ -p_236) -> (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0)
c  in CNF:
c     b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_2
c     b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_1
c     b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨  b^{59, 5}_0
c  in DIMACS:
 17462 -17463  17464  236 -17465 0
 17462 -17463  17464  236 -17466 0
 17462 -17463  17464  236  17467 0

c  1-1 --> 0
c    (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0 ∧ -p_236) -> (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧ -b^{59, 5}_0)
c  in CNF:
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_2
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_1
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_0
c  in DIMACS:
 17462  17463 -17464  236 -17465 0
 17462  17463 -17464  236 -17466 0
 17462  17463 -17464  236 -17467 0

c  0-1 --> -1
c    (-b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧ -p_236) -> ( b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0)
c  in CNF:
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨  b^{59, 5}_2
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_1
c     b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨  b^{59, 5}_0
c  in DIMACS:
 17462  17463  17464  236  17465 0
 17462  17463  17464  236 -17466 0
 17462  17463  17464  236  17467 0

c  -1-1 --> -2
c    ( b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧  b^{59, 4}_0 ∧ -p_236) -> ( b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0)
c  in CNF:
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨  b^{59, 5}_2
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨  b^{59, 5}_1
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨  p_236 ∨ -b^{59, 5}_0
c  in DIMACS:
-17462  17463 -17464  236  17465 0
-17462  17463 -17464  236  17466 0
-17462  17463 -17464  236 -17467 0

c  -2-1 --> break 
c    ( b^{59, 4}_2 ∧  b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨  b^{59, 4}_0 ∨  p_236 ∨ break
c  in DIMACS:
-17462 -17463  17464  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 4}_2 ∧ -b^{59, 4}_1 ∧ -b^{59, 4}_0 ∧ true) 
c  in CNF:
c    -b^{59, 4}_2 ∨  b^{59, 4}_1 ∨  b^{59, 4}_0 ∨ false 
c  in DIMACS:
-17462  17463  17464  0

c  3 does not represent an automaton state.
c    -(-b^{59, 4}_2 ∧  b^{59, 4}_1 ∧  b^{59, 4}_0 ∧ true) 
c  in CNF:
c     b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ false 
c  in DIMACS:
 17462 -17463 -17464  0
c  -3 does not represent an automaton state.
c    -( b^{59, 4}_2 ∧  b^{59, 4}_1 ∧  b^{59, 4}_0 ∧ true) 
c  in CNF:
c    -b^{59, 4}_2 ∨ -b^{59, 4}_1 ∨ -b^{59, 4}_0 ∨ false 
c  in DIMACS:
-17462 -17463 -17464  0

c i = 5
c  -2+1 --> -1
c    ( b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧  p_295) -> ( b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0)
c  in CNF:
c    -b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨  b^{59, 6}_2
c    -b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_1
c    -b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨  b^{59, 6}_0
c  in DIMACS:
-17465 -17466  17467 -295  17468 0
-17465 -17466  17467 -295 -17469 0
-17465 -17466  17467 -295  17470 0

c  -1+1 --> 0
c    ( b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0 ∧  p_295) -> (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧ -b^{59, 6}_0)
c  in CNF:
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_2
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_1
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_0
c  in DIMACS:
-17465  17466 -17467 -295 -17468 0
-17465  17466 -17467 -295 -17469 0
-17465  17466 -17467 -295 -17470 0

c  0+1 --> 1
c    (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧  p_295) -> (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0)
c  in CNF:
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_2
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_1
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨  b^{59, 6}_0
c  in DIMACS:
 17465  17466  17467 -295 -17468 0
 17465  17466  17467 -295 -17469 0
 17465  17466  17467 -295  17470 0

c  1+1 --> 2
c    (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0 ∧  p_295) -> (-b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0)
c  in CNF:
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_2
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨  b^{59, 6}_1
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ -p_295 ∨ -b^{59, 6}_0
c  in DIMACS:
 17465  17466 -17467 -295 -17468 0
 17465  17466 -17467 -295  17469 0
 17465  17466 -17467 -295 -17470 0

c  2+1 --> break 
c    (-b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧  p_295) -> break
c  in CNF:
c     b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ -p_295 ∨ break
c  in DIMACS:
 17465 -17466  17467 -295 1162 0


c  2-1 --> 1
c    (-b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧ -p_295) -> (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0)
c  in CNF:
c     b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_2
c     b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_1
c     b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨  b^{59, 6}_0
c  in DIMACS:
 17465 -17466  17467  295 -17468 0
 17465 -17466  17467  295 -17469 0
 17465 -17466  17467  295  17470 0

c  1-1 --> 0
c    (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0 ∧ -p_295) -> (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧ -b^{59, 6}_0)
c  in CNF:
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_2
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_1
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_0
c  in DIMACS:
 17465  17466 -17467  295 -17468 0
 17465  17466 -17467  295 -17469 0
 17465  17466 -17467  295 -17470 0

c  0-1 --> -1
c    (-b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧ -p_295) -> ( b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0)
c  in CNF:
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨  b^{59, 6}_2
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_1
c     b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨  b^{59, 6}_0
c  in DIMACS:
 17465  17466  17467  295  17468 0
 17465  17466  17467  295 -17469 0
 17465  17466  17467  295  17470 0

c  -1-1 --> -2
c    ( b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧  b^{59, 5}_0 ∧ -p_295) -> ( b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0)
c  in CNF:
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨  b^{59, 6}_2
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨  b^{59, 6}_1
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨  p_295 ∨ -b^{59, 6}_0
c  in DIMACS:
-17465  17466 -17467  295  17468 0
-17465  17466 -17467  295  17469 0
-17465  17466 -17467  295 -17470 0

c  -2-1 --> break 
c    ( b^{59, 5}_2 ∧  b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧ -p_295) -> break
c  in CNF:
c    -b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨  b^{59, 5}_0 ∨  p_295 ∨ break
c  in DIMACS:
-17465 -17466  17467  295 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 5}_2 ∧ -b^{59, 5}_1 ∧ -b^{59, 5}_0 ∧ true) 
c  in CNF:
c    -b^{59, 5}_2 ∨  b^{59, 5}_1 ∨  b^{59, 5}_0 ∨ false 
c  in DIMACS:
-17465  17466  17467  0

c  3 does not represent an automaton state.
c    -(-b^{59, 5}_2 ∧  b^{59, 5}_1 ∧  b^{59, 5}_0 ∧ true) 
c  in CNF:
c     b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ false 
c  in DIMACS:
 17465 -17466 -17467  0
c  -3 does not represent an automaton state.
c    -( b^{59, 5}_2 ∧  b^{59, 5}_1 ∧  b^{59, 5}_0 ∧ true) 
c  in CNF:
c    -b^{59, 5}_2 ∨ -b^{59, 5}_1 ∨ -b^{59, 5}_0 ∨ false 
c  in DIMACS:
-17465 -17466 -17467  0

c i = 6
c  -2+1 --> -1
c    ( b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧  p_354) -> ( b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0)
c  in CNF:
c    -b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨  b^{59, 7}_2
c    -b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_1
c    -b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨  b^{59, 7}_0
c  in DIMACS:
-17468 -17469  17470 -354  17471 0
-17468 -17469  17470 -354 -17472 0
-17468 -17469  17470 -354  17473 0

c  -1+1 --> 0
c    ( b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0 ∧  p_354) -> (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧ -b^{59, 7}_0)
c  in CNF:
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_2
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_1
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_0
c  in DIMACS:
-17468  17469 -17470 -354 -17471 0
-17468  17469 -17470 -354 -17472 0
-17468  17469 -17470 -354 -17473 0

c  0+1 --> 1
c    (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧  p_354) -> (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0)
c  in CNF:
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_2
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_1
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨  b^{59, 7}_0
c  in DIMACS:
 17468  17469  17470 -354 -17471 0
 17468  17469  17470 -354 -17472 0
 17468  17469  17470 -354  17473 0

c  1+1 --> 2
c    (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0 ∧  p_354) -> (-b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0)
c  in CNF:
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_2
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨  b^{59, 7}_1
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ -p_354 ∨ -b^{59, 7}_0
c  in DIMACS:
 17468  17469 -17470 -354 -17471 0
 17468  17469 -17470 -354  17472 0
 17468  17469 -17470 -354 -17473 0

c  2+1 --> break 
c    (-b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧  p_354) -> break
c  in CNF:
c     b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 17468 -17469  17470 -354 1162 0


c  2-1 --> 1
c    (-b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧ -p_354) -> (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0)
c  in CNF:
c     b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_2
c     b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_1
c     b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨  b^{59, 7}_0
c  in DIMACS:
 17468 -17469  17470  354 -17471 0
 17468 -17469  17470  354 -17472 0
 17468 -17469  17470  354  17473 0

c  1-1 --> 0
c    (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0 ∧ -p_354) -> (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧ -b^{59, 7}_0)
c  in CNF:
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_2
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_1
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_0
c  in DIMACS:
 17468  17469 -17470  354 -17471 0
 17468  17469 -17470  354 -17472 0
 17468  17469 -17470  354 -17473 0

c  0-1 --> -1
c    (-b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧ -p_354) -> ( b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0)
c  in CNF:
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨  b^{59, 7}_2
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_1
c     b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨  b^{59, 7}_0
c  in DIMACS:
 17468  17469  17470  354  17471 0
 17468  17469  17470  354 -17472 0
 17468  17469  17470  354  17473 0

c  -1-1 --> -2
c    ( b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧  b^{59, 6}_0 ∧ -p_354) -> ( b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0)
c  in CNF:
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨  b^{59, 7}_2
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨  b^{59, 7}_1
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨  p_354 ∨ -b^{59, 7}_0
c  in DIMACS:
-17468  17469 -17470  354  17471 0
-17468  17469 -17470  354  17472 0
-17468  17469 -17470  354 -17473 0

c  -2-1 --> break 
c    ( b^{59, 6}_2 ∧  b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨  b^{59, 6}_0 ∨  p_354 ∨ break
c  in DIMACS:
-17468 -17469  17470  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 6}_2 ∧ -b^{59, 6}_1 ∧ -b^{59, 6}_0 ∧ true) 
c  in CNF:
c    -b^{59, 6}_2 ∨  b^{59, 6}_1 ∨  b^{59, 6}_0 ∨ false 
c  in DIMACS:
-17468  17469  17470  0

c  3 does not represent an automaton state.
c    -(-b^{59, 6}_2 ∧  b^{59, 6}_1 ∧  b^{59, 6}_0 ∧ true) 
c  in CNF:
c     b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ false 
c  in DIMACS:
 17468 -17469 -17470  0
c  -3 does not represent an automaton state.
c    -( b^{59, 6}_2 ∧  b^{59, 6}_1 ∧  b^{59, 6}_0 ∧ true) 
c  in CNF:
c    -b^{59, 6}_2 ∨ -b^{59, 6}_1 ∨ -b^{59, 6}_0 ∨ false 
c  in DIMACS:
-17468 -17469 -17470  0

c i = 7
c  -2+1 --> -1
c    ( b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧  p_413) -> ( b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0)
c  in CNF:
c    -b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨  b^{59, 8}_2
c    -b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_1
c    -b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨  b^{59, 8}_0
c  in DIMACS:
-17471 -17472  17473 -413  17474 0
-17471 -17472  17473 -413 -17475 0
-17471 -17472  17473 -413  17476 0

c  -1+1 --> 0
c    ( b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0 ∧  p_413) -> (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧ -b^{59, 8}_0)
c  in CNF:
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_2
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_1
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_0
c  in DIMACS:
-17471  17472 -17473 -413 -17474 0
-17471  17472 -17473 -413 -17475 0
-17471  17472 -17473 -413 -17476 0

c  0+1 --> 1
c    (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧  p_413) -> (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0)
c  in CNF:
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_2
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_1
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨  b^{59, 8}_0
c  in DIMACS:
 17471  17472  17473 -413 -17474 0
 17471  17472  17473 -413 -17475 0
 17471  17472  17473 -413  17476 0

c  1+1 --> 2
c    (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0 ∧  p_413) -> (-b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0)
c  in CNF:
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_2
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨  b^{59, 8}_1
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ -p_413 ∨ -b^{59, 8}_0
c  in DIMACS:
 17471  17472 -17473 -413 -17474 0
 17471  17472 -17473 -413  17475 0
 17471  17472 -17473 -413 -17476 0

c  2+1 --> break 
c    (-b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧  p_413) -> break
c  in CNF:
c     b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ -p_413 ∨ break
c  in DIMACS:
 17471 -17472  17473 -413 1162 0


c  2-1 --> 1
c    (-b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧ -p_413) -> (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0)
c  in CNF:
c     b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_2
c     b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_1
c     b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨  b^{59, 8}_0
c  in DIMACS:
 17471 -17472  17473  413 -17474 0
 17471 -17472  17473  413 -17475 0
 17471 -17472  17473  413  17476 0

c  1-1 --> 0
c    (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0 ∧ -p_413) -> (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧ -b^{59, 8}_0)
c  in CNF:
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_2
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_1
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_0
c  in DIMACS:
 17471  17472 -17473  413 -17474 0
 17471  17472 -17473  413 -17475 0
 17471  17472 -17473  413 -17476 0

c  0-1 --> -1
c    (-b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧ -p_413) -> ( b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0)
c  in CNF:
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨  b^{59, 8}_2
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_1
c     b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨  b^{59, 8}_0
c  in DIMACS:
 17471  17472  17473  413  17474 0
 17471  17472  17473  413 -17475 0
 17471  17472  17473  413  17476 0

c  -1-1 --> -2
c    ( b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧  b^{59, 7}_0 ∧ -p_413) -> ( b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0)
c  in CNF:
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨  b^{59, 8}_2
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨  b^{59, 8}_1
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨  p_413 ∨ -b^{59, 8}_0
c  in DIMACS:
-17471  17472 -17473  413  17474 0
-17471  17472 -17473  413  17475 0
-17471  17472 -17473  413 -17476 0

c  -2-1 --> break 
c    ( b^{59, 7}_2 ∧  b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧ -p_413) -> break
c  in CNF:
c    -b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨  b^{59, 7}_0 ∨  p_413 ∨ break
c  in DIMACS:
-17471 -17472  17473  413 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 7}_2 ∧ -b^{59, 7}_1 ∧ -b^{59, 7}_0 ∧ true) 
c  in CNF:
c    -b^{59, 7}_2 ∨  b^{59, 7}_1 ∨  b^{59, 7}_0 ∨ false 
c  in DIMACS:
-17471  17472  17473  0

c  3 does not represent an automaton state.
c    -(-b^{59, 7}_2 ∧  b^{59, 7}_1 ∧  b^{59, 7}_0 ∧ true) 
c  in CNF:
c     b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ false 
c  in DIMACS:
 17471 -17472 -17473  0
c  -3 does not represent an automaton state.
c    -( b^{59, 7}_2 ∧  b^{59, 7}_1 ∧  b^{59, 7}_0 ∧ true) 
c  in CNF:
c    -b^{59, 7}_2 ∨ -b^{59, 7}_1 ∨ -b^{59, 7}_0 ∨ false 
c  in DIMACS:
-17471 -17472 -17473  0

c i = 8
c  -2+1 --> -1
c    ( b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧  p_472) -> ( b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0)
c  in CNF:
c    -b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨  b^{59, 9}_2
c    -b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_1
c    -b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨  b^{59, 9}_0
c  in DIMACS:
-17474 -17475  17476 -472  17477 0
-17474 -17475  17476 -472 -17478 0
-17474 -17475  17476 -472  17479 0

c  -1+1 --> 0
c    ( b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0 ∧  p_472) -> (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧ -b^{59, 9}_0)
c  in CNF:
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_2
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_1
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_0
c  in DIMACS:
-17474  17475 -17476 -472 -17477 0
-17474  17475 -17476 -472 -17478 0
-17474  17475 -17476 -472 -17479 0

c  0+1 --> 1
c    (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧  p_472) -> (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0)
c  in CNF:
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_2
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_1
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨  b^{59, 9}_0
c  in DIMACS:
 17474  17475  17476 -472 -17477 0
 17474  17475  17476 -472 -17478 0
 17474  17475  17476 -472  17479 0

c  1+1 --> 2
c    (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0 ∧  p_472) -> (-b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0)
c  in CNF:
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_2
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨  b^{59, 9}_1
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ -p_472 ∨ -b^{59, 9}_0
c  in DIMACS:
 17474  17475 -17476 -472 -17477 0
 17474  17475 -17476 -472  17478 0
 17474  17475 -17476 -472 -17479 0

c  2+1 --> break 
c    (-b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧  p_472) -> break
c  in CNF:
c     b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 17474 -17475  17476 -472 1162 0


c  2-1 --> 1
c    (-b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧ -p_472) -> (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0)
c  in CNF:
c     b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_2
c     b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_1
c     b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨  b^{59, 9}_0
c  in DIMACS:
 17474 -17475  17476  472 -17477 0
 17474 -17475  17476  472 -17478 0
 17474 -17475  17476  472  17479 0

c  1-1 --> 0
c    (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0 ∧ -p_472) -> (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧ -b^{59, 9}_0)
c  in CNF:
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_2
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_1
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_0
c  in DIMACS:
 17474  17475 -17476  472 -17477 0
 17474  17475 -17476  472 -17478 0
 17474  17475 -17476  472 -17479 0

c  0-1 --> -1
c    (-b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧ -p_472) -> ( b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0)
c  in CNF:
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨  b^{59, 9}_2
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_1
c     b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨  b^{59, 9}_0
c  in DIMACS:
 17474  17475  17476  472  17477 0
 17474  17475  17476  472 -17478 0
 17474  17475  17476  472  17479 0

c  -1-1 --> -2
c    ( b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧  b^{59, 8}_0 ∧ -p_472) -> ( b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0)
c  in CNF:
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨  b^{59, 9}_2
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨  b^{59, 9}_1
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨  p_472 ∨ -b^{59, 9}_0
c  in DIMACS:
-17474  17475 -17476  472  17477 0
-17474  17475 -17476  472  17478 0
-17474  17475 -17476  472 -17479 0

c  -2-1 --> break 
c    ( b^{59, 8}_2 ∧  b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨  b^{59, 8}_0 ∨  p_472 ∨ break
c  in DIMACS:
-17474 -17475  17476  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 8}_2 ∧ -b^{59, 8}_1 ∧ -b^{59, 8}_0 ∧ true) 
c  in CNF:
c    -b^{59, 8}_2 ∨  b^{59, 8}_1 ∨  b^{59, 8}_0 ∨ false 
c  in DIMACS:
-17474  17475  17476  0

c  3 does not represent an automaton state.
c    -(-b^{59, 8}_2 ∧  b^{59, 8}_1 ∧  b^{59, 8}_0 ∧ true) 
c  in CNF:
c     b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ false 
c  in DIMACS:
 17474 -17475 -17476  0
c  -3 does not represent an automaton state.
c    -( b^{59, 8}_2 ∧  b^{59, 8}_1 ∧  b^{59, 8}_0 ∧ true) 
c  in CNF:
c    -b^{59, 8}_2 ∨ -b^{59, 8}_1 ∨ -b^{59, 8}_0 ∨ false 
c  in DIMACS:
-17474 -17475 -17476  0

c i = 9
c  -2+1 --> -1
c    ( b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧  p_531) -> ( b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0)
c  in CNF:
c    -b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨  b^{59, 10}_2
c    -b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_1
c    -b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨  b^{59, 10}_0
c  in DIMACS:
-17477 -17478  17479 -531  17480 0
-17477 -17478  17479 -531 -17481 0
-17477 -17478  17479 -531  17482 0

c  -1+1 --> 0
c    ( b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0 ∧  p_531) -> (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧ -b^{59, 10}_0)
c  in CNF:
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_2
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_1
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_0
c  in DIMACS:
-17477  17478 -17479 -531 -17480 0
-17477  17478 -17479 -531 -17481 0
-17477  17478 -17479 -531 -17482 0

c  0+1 --> 1
c    (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧  p_531) -> (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0)
c  in CNF:
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_2
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_1
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨  b^{59, 10}_0
c  in DIMACS:
 17477  17478  17479 -531 -17480 0
 17477  17478  17479 -531 -17481 0
 17477  17478  17479 -531  17482 0

c  1+1 --> 2
c    (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0 ∧  p_531) -> (-b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0)
c  in CNF:
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_2
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨  b^{59, 10}_1
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ -p_531 ∨ -b^{59, 10}_0
c  in DIMACS:
 17477  17478 -17479 -531 -17480 0
 17477  17478 -17479 -531  17481 0
 17477  17478 -17479 -531 -17482 0

c  2+1 --> break 
c    (-b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧  p_531) -> break
c  in CNF:
c     b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ -p_531 ∨ break
c  in DIMACS:
 17477 -17478  17479 -531 1162 0


c  2-1 --> 1
c    (-b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧ -p_531) -> (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0)
c  in CNF:
c     b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_2
c     b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_1
c     b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨  b^{59, 10}_0
c  in DIMACS:
 17477 -17478  17479  531 -17480 0
 17477 -17478  17479  531 -17481 0
 17477 -17478  17479  531  17482 0

c  1-1 --> 0
c    (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0 ∧ -p_531) -> (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧ -b^{59, 10}_0)
c  in CNF:
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_2
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_1
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_0
c  in DIMACS:
 17477  17478 -17479  531 -17480 0
 17477  17478 -17479  531 -17481 0
 17477  17478 -17479  531 -17482 0

c  0-1 --> -1
c    (-b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧ -p_531) -> ( b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0)
c  in CNF:
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨  b^{59, 10}_2
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_1
c     b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨  b^{59, 10}_0
c  in DIMACS:
 17477  17478  17479  531  17480 0
 17477  17478  17479  531 -17481 0
 17477  17478  17479  531  17482 0

c  -1-1 --> -2
c    ( b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧  b^{59, 9}_0 ∧ -p_531) -> ( b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0)
c  in CNF:
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨  b^{59, 10}_2
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨  b^{59, 10}_1
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨  p_531 ∨ -b^{59, 10}_0
c  in DIMACS:
-17477  17478 -17479  531  17480 0
-17477  17478 -17479  531  17481 0
-17477  17478 -17479  531 -17482 0

c  -2-1 --> break 
c    ( b^{59, 9}_2 ∧  b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧ -p_531) -> break
c  in CNF:
c    -b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨  b^{59, 9}_0 ∨  p_531 ∨ break
c  in DIMACS:
-17477 -17478  17479  531 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 9}_2 ∧ -b^{59, 9}_1 ∧ -b^{59, 9}_0 ∧ true) 
c  in CNF:
c    -b^{59, 9}_2 ∨  b^{59, 9}_1 ∨  b^{59, 9}_0 ∨ false 
c  in DIMACS:
-17477  17478  17479  0

c  3 does not represent an automaton state.
c    -(-b^{59, 9}_2 ∧  b^{59, 9}_1 ∧  b^{59, 9}_0 ∧ true) 
c  in CNF:
c     b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ false 
c  in DIMACS:
 17477 -17478 -17479  0
c  -3 does not represent an automaton state.
c    -( b^{59, 9}_2 ∧  b^{59, 9}_1 ∧  b^{59, 9}_0 ∧ true) 
c  in CNF:
c    -b^{59, 9}_2 ∨ -b^{59, 9}_1 ∨ -b^{59, 9}_0 ∨ false 
c  in DIMACS:
-17477 -17478 -17479  0

c i = 10
c  -2+1 --> -1
c    ( b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧  p_590) -> ( b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0)
c  in CNF:
c    -b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨  b^{59, 11}_2
c    -b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_1
c    -b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨  b^{59, 11}_0
c  in DIMACS:
-17480 -17481  17482 -590  17483 0
-17480 -17481  17482 -590 -17484 0
-17480 -17481  17482 -590  17485 0

c  -1+1 --> 0
c    ( b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0 ∧  p_590) -> (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧ -b^{59, 11}_0)
c  in CNF:
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_2
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_1
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_0
c  in DIMACS:
-17480  17481 -17482 -590 -17483 0
-17480  17481 -17482 -590 -17484 0
-17480  17481 -17482 -590 -17485 0

c  0+1 --> 1
c    (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧  p_590) -> (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0)
c  in CNF:
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_2
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_1
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨  b^{59, 11}_0
c  in DIMACS:
 17480  17481  17482 -590 -17483 0
 17480  17481  17482 -590 -17484 0
 17480  17481  17482 -590  17485 0

c  1+1 --> 2
c    (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0 ∧  p_590) -> (-b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0)
c  in CNF:
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_2
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨  b^{59, 11}_1
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ -p_590 ∨ -b^{59, 11}_0
c  in DIMACS:
 17480  17481 -17482 -590 -17483 0
 17480  17481 -17482 -590  17484 0
 17480  17481 -17482 -590 -17485 0

c  2+1 --> break 
c    (-b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧  p_590) -> break
c  in CNF:
c     b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 17480 -17481  17482 -590 1162 0


c  2-1 --> 1
c    (-b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧ -p_590) -> (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0)
c  in CNF:
c     b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_2
c     b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_1
c     b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨  b^{59, 11}_0
c  in DIMACS:
 17480 -17481  17482  590 -17483 0
 17480 -17481  17482  590 -17484 0
 17480 -17481  17482  590  17485 0

c  1-1 --> 0
c    (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0 ∧ -p_590) -> (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧ -b^{59, 11}_0)
c  in CNF:
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_2
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_1
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_0
c  in DIMACS:
 17480  17481 -17482  590 -17483 0
 17480  17481 -17482  590 -17484 0
 17480  17481 -17482  590 -17485 0

c  0-1 --> -1
c    (-b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧ -p_590) -> ( b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0)
c  in CNF:
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨  b^{59, 11}_2
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_1
c     b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨  b^{59, 11}_0
c  in DIMACS:
 17480  17481  17482  590  17483 0
 17480  17481  17482  590 -17484 0
 17480  17481  17482  590  17485 0

c  -1-1 --> -2
c    ( b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧  b^{59, 10}_0 ∧ -p_590) -> ( b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0)
c  in CNF:
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨  b^{59, 11}_2
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨  b^{59, 11}_1
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨  p_590 ∨ -b^{59, 11}_0
c  in DIMACS:
-17480  17481 -17482  590  17483 0
-17480  17481 -17482  590  17484 0
-17480  17481 -17482  590 -17485 0

c  -2-1 --> break 
c    ( b^{59, 10}_2 ∧  b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨  b^{59, 10}_0 ∨  p_590 ∨ break
c  in DIMACS:
-17480 -17481  17482  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 10}_2 ∧ -b^{59, 10}_1 ∧ -b^{59, 10}_0 ∧ true) 
c  in CNF:
c    -b^{59, 10}_2 ∨  b^{59, 10}_1 ∨  b^{59, 10}_0 ∨ false 
c  in DIMACS:
-17480  17481  17482  0

c  3 does not represent an automaton state.
c    -(-b^{59, 10}_2 ∧  b^{59, 10}_1 ∧  b^{59, 10}_0 ∧ true) 
c  in CNF:
c     b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ false 
c  in DIMACS:
 17480 -17481 -17482  0
c  -3 does not represent an automaton state.
c    -( b^{59, 10}_2 ∧  b^{59, 10}_1 ∧  b^{59, 10}_0 ∧ true) 
c  in CNF:
c    -b^{59, 10}_2 ∨ -b^{59, 10}_1 ∨ -b^{59, 10}_0 ∨ false 
c  in DIMACS:
-17480 -17481 -17482  0

c i = 11
c  -2+1 --> -1
c    ( b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧  p_649) -> ( b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0)
c  in CNF:
c    -b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨  b^{59, 12}_2
c    -b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_1
c    -b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨  b^{59, 12}_0
c  in DIMACS:
-17483 -17484  17485 -649  17486 0
-17483 -17484  17485 -649 -17487 0
-17483 -17484  17485 -649  17488 0

c  -1+1 --> 0
c    ( b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0 ∧  p_649) -> (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧ -b^{59, 12}_0)
c  in CNF:
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_2
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_1
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_0
c  in DIMACS:
-17483  17484 -17485 -649 -17486 0
-17483  17484 -17485 -649 -17487 0
-17483  17484 -17485 -649 -17488 0

c  0+1 --> 1
c    (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧  p_649) -> (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0)
c  in CNF:
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_2
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_1
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨  b^{59, 12}_0
c  in DIMACS:
 17483  17484  17485 -649 -17486 0
 17483  17484  17485 -649 -17487 0
 17483  17484  17485 -649  17488 0

c  1+1 --> 2
c    (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0 ∧  p_649) -> (-b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0)
c  in CNF:
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_2
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨  b^{59, 12}_1
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ -p_649 ∨ -b^{59, 12}_0
c  in DIMACS:
 17483  17484 -17485 -649 -17486 0
 17483  17484 -17485 -649  17487 0
 17483  17484 -17485 -649 -17488 0

c  2+1 --> break 
c    (-b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧  p_649) -> break
c  in CNF:
c     b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ -p_649 ∨ break
c  in DIMACS:
 17483 -17484  17485 -649 1162 0


c  2-1 --> 1
c    (-b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧ -p_649) -> (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0)
c  in CNF:
c     b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_2
c     b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_1
c     b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨  b^{59, 12}_0
c  in DIMACS:
 17483 -17484  17485  649 -17486 0
 17483 -17484  17485  649 -17487 0
 17483 -17484  17485  649  17488 0

c  1-1 --> 0
c    (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0 ∧ -p_649) -> (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧ -b^{59, 12}_0)
c  in CNF:
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_2
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_1
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_0
c  in DIMACS:
 17483  17484 -17485  649 -17486 0
 17483  17484 -17485  649 -17487 0
 17483  17484 -17485  649 -17488 0

c  0-1 --> -1
c    (-b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧ -p_649) -> ( b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0)
c  in CNF:
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨  b^{59, 12}_2
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_1
c     b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨  b^{59, 12}_0
c  in DIMACS:
 17483  17484  17485  649  17486 0
 17483  17484  17485  649 -17487 0
 17483  17484  17485  649  17488 0

c  -1-1 --> -2
c    ( b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧  b^{59, 11}_0 ∧ -p_649) -> ( b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0)
c  in CNF:
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨  b^{59, 12}_2
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨  b^{59, 12}_1
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨  p_649 ∨ -b^{59, 12}_0
c  in DIMACS:
-17483  17484 -17485  649  17486 0
-17483  17484 -17485  649  17487 0
-17483  17484 -17485  649 -17488 0

c  -2-1 --> break 
c    ( b^{59, 11}_2 ∧  b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧ -p_649) -> break
c  in CNF:
c    -b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨  b^{59, 11}_0 ∨  p_649 ∨ break
c  in DIMACS:
-17483 -17484  17485  649 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 11}_2 ∧ -b^{59, 11}_1 ∧ -b^{59, 11}_0 ∧ true) 
c  in CNF:
c    -b^{59, 11}_2 ∨  b^{59, 11}_1 ∨  b^{59, 11}_0 ∨ false 
c  in DIMACS:
-17483  17484  17485  0

c  3 does not represent an automaton state.
c    -(-b^{59, 11}_2 ∧  b^{59, 11}_1 ∧  b^{59, 11}_0 ∧ true) 
c  in CNF:
c     b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ false 
c  in DIMACS:
 17483 -17484 -17485  0
c  -3 does not represent an automaton state.
c    -( b^{59, 11}_2 ∧  b^{59, 11}_1 ∧  b^{59, 11}_0 ∧ true) 
c  in CNF:
c    -b^{59, 11}_2 ∨ -b^{59, 11}_1 ∨ -b^{59, 11}_0 ∨ false 
c  in DIMACS:
-17483 -17484 -17485  0

c i = 12
c  -2+1 --> -1
c    ( b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧  p_708) -> ( b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0)
c  in CNF:
c    -b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨  b^{59, 13}_2
c    -b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_1
c    -b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨  b^{59, 13}_0
c  in DIMACS:
-17486 -17487  17488 -708  17489 0
-17486 -17487  17488 -708 -17490 0
-17486 -17487  17488 -708  17491 0

c  -1+1 --> 0
c    ( b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0 ∧  p_708) -> (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧ -b^{59, 13}_0)
c  in CNF:
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_2
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_1
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_0
c  in DIMACS:
-17486  17487 -17488 -708 -17489 0
-17486  17487 -17488 -708 -17490 0
-17486  17487 -17488 -708 -17491 0

c  0+1 --> 1
c    (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧  p_708) -> (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0)
c  in CNF:
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_2
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_1
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨  b^{59, 13}_0
c  in DIMACS:
 17486  17487  17488 -708 -17489 0
 17486  17487  17488 -708 -17490 0
 17486  17487  17488 -708  17491 0

c  1+1 --> 2
c    (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0 ∧  p_708) -> (-b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0)
c  in CNF:
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_2
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨  b^{59, 13}_1
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ -p_708 ∨ -b^{59, 13}_0
c  in DIMACS:
 17486  17487 -17488 -708 -17489 0
 17486  17487 -17488 -708  17490 0
 17486  17487 -17488 -708 -17491 0

c  2+1 --> break 
c    (-b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧  p_708) -> break
c  in CNF:
c     b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 17486 -17487  17488 -708 1162 0


c  2-1 --> 1
c    (-b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧ -p_708) -> (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0)
c  in CNF:
c     b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_2
c     b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_1
c     b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨  b^{59, 13}_0
c  in DIMACS:
 17486 -17487  17488  708 -17489 0
 17486 -17487  17488  708 -17490 0
 17486 -17487  17488  708  17491 0

c  1-1 --> 0
c    (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0 ∧ -p_708) -> (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧ -b^{59, 13}_0)
c  in CNF:
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_2
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_1
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_0
c  in DIMACS:
 17486  17487 -17488  708 -17489 0
 17486  17487 -17488  708 -17490 0
 17486  17487 -17488  708 -17491 0

c  0-1 --> -1
c    (-b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧ -p_708) -> ( b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0)
c  in CNF:
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨  b^{59, 13}_2
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_1
c     b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨  b^{59, 13}_0
c  in DIMACS:
 17486  17487  17488  708  17489 0
 17486  17487  17488  708 -17490 0
 17486  17487  17488  708  17491 0

c  -1-1 --> -2
c    ( b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧  b^{59, 12}_0 ∧ -p_708) -> ( b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0)
c  in CNF:
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨  b^{59, 13}_2
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨  b^{59, 13}_1
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨  p_708 ∨ -b^{59, 13}_0
c  in DIMACS:
-17486  17487 -17488  708  17489 0
-17486  17487 -17488  708  17490 0
-17486  17487 -17488  708 -17491 0

c  -2-1 --> break 
c    ( b^{59, 12}_2 ∧  b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨  b^{59, 12}_0 ∨  p_708 ∨ break
c  in DIMACS:
-17486 -17487  17488  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 12}_2 ∧ -b^{59, 12}_1 ∧ -b^{59, 12}_0 ∧ true) 
c  in CNF:
c    -b^{59, 12}_2 ∨  b^{59, 12}_1 ∨  b^{59, 12}_0 ∨ false 
c  in DIMACS:
-17486  17487  17488  0

c  3 does not represent an automaton state.
c    -(-b^{59, 12}_2 ∧  b^{59, 12}_1 ∧  b^{59, 12}_0 ∧ true) 
c  in CNF:
c     b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ false 
c  in DIMACS:
 17486 -17487 -17488  0
c  -3 does not represent an automaton state.
c    -( b^{59, 12}_2 ∧  b^{59, 12}_1 ∧  b^{59, 12}_0 ∧ true) 
c  in CNF:
c    -b^{59, 12}_2 ∨ -b^{59, 12}_1 ∨ -b^{59, 12}_0 ∨ false 
c  in DIMACS:
-17486 -17487 -17488  0

c i = 13
c  -2+1 --> -1
c    ( b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧  p_767) -> ( b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0)
c  in CNF:
c    -b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨  b^{59, 14}_2
c    -b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_1
c    -b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨  b^{59, 14}_0
c  in DIMACS:
-17489 -17490  17491 -767  17492 0
-17489 -17490  17491 -767 -17493 0
-17489 -17490  17491 -767  17494 0

c  -1+1 --> 0
c    ( b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0 ∧  p_767) -> (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧ -b^{59, 14}_0)
c  in CNF:
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_2
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_1
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_0
c  in DIMACS:
-17489  17490 -17491 -767 -17492 0
-17489  17490 -17491 -767 -17493 0
-17489  17490 -17491 -767 -17494 0

c  0+1 --> 1
c    (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧  p_767) -> (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0)
c  in CNF:
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_2
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_1
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨  b^{59, 14}_0
c  in DIMACS:
 17489  17490  17491 -767 -17492 0
 17489  17490  17491 -767 -17493 0
 17489  17490  17491 -767  17494 0

c  1+1 --> 2
c    (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0 ∧  p_767) -> (-b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0)
c  in CNF:
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_2
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨  b^{59, 14}_1
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ -p_767 ∨ -b^{59, 14}_0
c  in DIMACS:
 17489  17490 -17491 -767 -17492 0
 17489  17490 -17491 -767  17493 0
 17489  17490 -17491 -767 -17494 0

c  2+1 --> break 
c    (-b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧  p_767) -> break
c  in CNF:
c     b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ -p_767 ∨ break
c  in DIMACS:
 17489 -17490  17491 -767 1162 0


c  2-1 --> 1
c    (-b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧ -p_767) -> (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0)
c  in CNF:
c     b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_2
c     b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_1
c     b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨  b^{59, 14}_0
c  in DIMACS:
 17489 -17490  17491  767 -17492 0
 17489 -17490  17491  767 -17493 0
 17489 -17490  17491  767  17494 0

c  1-1 --> 0
c    (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0 ∧ -p_767) -> (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧ -b^{59, 14}_0)
c  in CNF:
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_2
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_1
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_0
c  in DIMACS:
 17489  17490 -17491  767 -17492 0
 17489  17490 -17491  767 -17493 0
 17489  17490 -17491  767 -17494 0

c  0-1 --> -1
c    (-b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧ -p_767) -> ( b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0)
c  in CNF:
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨  b^{59, 14}_2
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_1
c     b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨  b^{59, 14}_0
c  in DIMACS:
 17489  17490  17491  767  17492 0
 17489  17490  17491  767 -17493 0
 17489  17490  17491  767  17494 0

c  -1-1 --> -2
c    ( b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧  b^{59, 13}_0 ∧ -p_767) -> ( b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0)
c  in CNF:
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨  b^{59, 14}_2
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨  b^{59, 14}_1
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨  p_767 ∨ -b^{59, 14}_0
c  in DIMACS:
-17489  17490 -17491  767  17492 0
-17489  17490 -17491  767  17493 0
-17489  17490 -17491  767 -17494 0

c  -2-1 --> break 
c    ( b^{59, 13}_2 ∧  b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧ -p_767) -> break
c  in CNF:
c    -b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨  b^{59, 13}_0 ∨  p_767 ∨ break
c  in DIMACS:
-17489 -17490  17491  767 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 13}_2 ∧ -b^{59, 13}_1 ∧ -b^{59, 13}_0 ∧ true) 
c  in CNF:
c    -b^{59, 13}_2 ∨  b^{59, 13}_1 ∨  b^{59, 13}_0 ∨ false 
c  in DIMACS:
-17489  17490  17491  0

c  3 does not represent an automaton state.
c    -(-b^{59, 13}_2 ∧  b^{59, 13}_1 ∧  b^{59, 13}_0 ∧ true) 
c  in CNF:
c     b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ false 
c  in DIMACS:
 17489 -17490 -17491  0
c  -3 does not represent an automaton state.
c    -( b^{59, 13}_2 ∧  b^{59, 13}_1 ∧  b^{59, 13}_0 ∧ true) 
c  in CNF:
c    -b^{59, 13}_2 ∨ -b^{59, 13}_1 ∨ -b^{59, 13}_0 ∨ false 
c  in DIMACS:
-17489 -17490 -17491  0

c i = 14
c  -2+1 --> -1
c    ( b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧  p_826) -> ( b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0)
c  in CNF:
c    -b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨  b^{59, 15}_2
c    -b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_1
c    -b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨  b^{59, 15}_0
c  in DIMACS:
-17492 -17493  17494 -826  17495 0
-17492 -17493  17494 -826 -17496 0
-17492 -17493  17494 -826  17497 0

c  -1+1 --> 0
c    ( b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0 ∧  p_826) -> (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧ -b^{59, 15}_0)
c  in CNF:
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_2
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_1
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_0
c  in DIMACS:
-17492  17493 -17494 -826 -17495 0
-17492  17493 -17494 -826 -17496 0
-17492  17493 -17494 -826 -17497 0

c  0+1 --> 1
c    (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧  p_826) -> (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0)
c  in CNF:
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_2
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_1
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨  b^{59, 15}_0
c  in DIMACS:
 17492  17493  17494 -826 -17495 0
 17492  17493  17494 -826 -17496 0
 17492  17493  17494 -826  17497 0

c  1+1 --> 2
c    (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0 ∧  p_826) -> (-b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0)
c  in CNF:
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_2
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨  b^{59, 15}_1
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ -p_826 ∨ -b^{59, 15}_0
c  in DIMACS:
 17492  17493 -17494 -826 -17495 0
 17492  17493 -17494 -826  17496 0
 17492  17493 -17494 -826 -17497 0

c  2+1 --> break 
c    (-b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧  p_826) -> break
c  in CNF:
c     b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 17492 -17493  17494 -826 1162 0


c  2-1 --> 1
c    (-b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧ -p_826) -> (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0)
c  in CNF:
c     b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_2
c     b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_1
c     b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨  b^{59, 15}_0
c  in DIMACS:
 17492 -17493  17494  826 -17495 0
 17492 -17493  17494  826 -17496 0
 17492 -17493  17494  826  17497 0

c  1-1 --> 0
c    (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0 ∧ -p_826) -> (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧ -b^{59, 15}_0)
c  in CNF:
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_2
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_1
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_0
c  in DIMACS:
 17492  17493 -17494  826 -17495 0
 17492  17493 -17494  826 -17496 0
 17492  17493 -17494  826 -17497 0

c  0-1 --> -1
c    (-b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧ -p_826) -> ( b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0)
c  in CNF:
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨  b^{59, 15}_2
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_1
c     b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨  b^{59, 15}_0
c  in DIMACS:
 17492  17493  17494  826  17495 0
 17492  17493  17494  826 -17496 0
 17492  17493  17494  826  17497 0

c  -1-1 --> -2
c    ( b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧  b^{59, 14}_0 ∧ -p_826) -> ( b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0)
c  in CNF:
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨  b^{59, 15}_2
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨  b^{59, 15}_1
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨  p_826 ∨ -b^{59, 15}_0
c  in DIMACS:
-17492  17493 -17494  826  17495 0
-17492  17493 -17494  826  17496 0
-17492  17493 -17494  826 -17497 0

c  -2-1 --> break 
c    ( b^{59, 14}_2 ∧  b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨  b^{59, 14}_0 ∨  p_826 ∨ break
c  in DIMACS:
-17492 -17493  17494  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 14}_2 ∧ -b^{59, 14}_1 ∧ -b^{59, 14}_0 ∧ true) 
c  in CNF:
c    -b^{59, 14}_2 ∨  b^{59, 14}_1 ∨  b^{59, 14}_0 ∨ false 
c  in DIMACS:
-17492  17493  17494  0

c  3 does not represent an automaton state.
c    -(-b^{59, 14}_2 ∧  b^{59, 14}_1 ∧  b^{59, 14}_0 ∧ true) 
c  in CNF:
c     b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ false 
c  in DIMACS:
 17492 -17493 -17494  0
c  -3 does not represent an automaton state.
c    -( b^{59, 14}_2 ∧  b^{59, 14}_1 ∧  b^{59, 14}_0 ∧ true) 
c  in CNF:
c    -b^{59, 14}_2 ∨ -b^{59, 14}_1 ∨ -b^{59, 14}_0 ∨ false 
c  in DIMACS:
-17492 -17493 -17494  0

c i = 15
c  -2+1 --> -1
c    ( b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧  p_885) -> ( b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0)
c  in CNF:
c    -b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨  b^{59, 16}_2
c    -b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_1
c    -b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨  b^{59, 16}_0
c  in DIMACS:
-17495 -17496  17497 -885  17498 0
-17495 -17496  17497 -885 -17499 0
-17495 -17496  17497 -885  17500 0

c  -1+1 --> 0
c    ( b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0 ∧  p_885) -> (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧ -b^{59, 16}_0)
c  in CNF:
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_2
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_1
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_0
c  in DIMACS:
-17495  17496 -17497 -885 -17498 0
-17495  17496 -17497 -885 -17499 0
-17495  17496 -17497 -885 -17500 0

c  0+1 --> 1
c    (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧  p_885) -> (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0)
c  in CNF:
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_2
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_1
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨  b^{59, 16}_0
c  in DIMACS:
 17495  17496  17497 -885 -17498 0
 17495  17496  17497 -885 -17499 0
 17495  17496  17497 -885  17500 0

c  1+1 --> 2
c    (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0 ∧  p_885) -> (-b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0)
c  in CNF:
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_2
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨  b^{59, 16}_1
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ -p_885 ∨ -b^{59, 16}_0
c  in DIMACS:
 17495  17496 -17497 -885 -17498 0
 17495  17496 -17497 -885  17499 0
 17495  17496 -17497 -885 -17500 0

c  2+1 --> break 
c    (-b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧  p_885) -> break
c  in CNF:
c     b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 17495 -17496  17497 -885 1162 0


c  2-1 --> 1
c    (-b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧ -p_885) -> (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0)
c  in CNF:
c     b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_2
c     b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_1
c     b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨  b^{59, 16}_0
c  in DIMACS:
 17495 -17496  17497  885 -17498 0
 17495 -17496  17497  885 -17499 0
 17495 -17496  17497  885  17500 0

c  1-1 --> 0
c    (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0 ∧ -p_885) -> (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧ -b^{59, 16}_0)
c  in CNF:
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_2
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_1
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_0
c  in DIMACS:
 17495  17496 -17497  885 -17498 0
 17495  17496 -17497  885 -17499 0
 17495  17496 -17497  885 -17500 0

c  0-1 --> -1
c    (-b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧ -p_885) -> ( b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0)
c  in CNF:
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨  b^{59, 16}_2
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_1
c     b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨  b^{59, 16}_0
c  in DIMACS:
 17495  17496  17497  885  17498 0
 17495  17496  17497  885 -17499 0
 17495  17496  17497  885  17500 0

c  -1-1 --> -2
c    ( b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧  b^{59, 15}_0 ∧ -p_885) -> ( b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0)
c  in CNF:
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨  b^{59, 16}_2
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨  b^{59, 16}_1
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨  p_885 ∨ -b^{59, 16}_0
c  in DIMACS:
-17495  17496 -17497  885  17498 0
-17495  17496 -17497  885  17499 0
-17495  17496 -17497  885 -17500 0

c  -2-1 --> break 
c    ( b^{59, 15}_2 ∧  b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨  b^{59, 15}_0 ∨  p_885 ∨ break
c  in DIMACS:
-17495 -17496  17497  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 15}_2 ∧ -b^{59, 15}_1 ∧ -b^{59, 15}_0 ∧ true) 
c  in CNF:
c    -b^{59, 15}_2 ∨  b^{59, 15}_1 ∨  b^{59, 15}_0 ∨ false 
c  in DIMACS:
-17495  17496  17497  0

c  3 does not represent an automaton state.
c    -(-b^{59, 15}_2 ∧  b^{59, 15}_1 ∧  b^{59, 15}_0 ∧ true) 
c  in CNF:
c     b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ false 
c  in DIMACS:
 17495 -17496 -17497  0
c  -3 does not represent an automaton state.
c    -( b^{59, 15}_2 ∧  b^{59, 15}_1 ∧  b^{59, 15}_0 ∧ true) 
c  in CNF:
c    -b^{59, 15}_2 ∨ -b^{59, 15}_1 ∨ -b^{59, 15}_0 ∨ false 
c  in DIMACS:
-17495 -17496 -17497  0

c i = 16
c  -2+1 --> -1
c    ( b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧  p_944) -> ( b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0)
c  in CNF:
c    -b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨  b^{59, 17}_2
c    -b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_1
c    -b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨  b^{59, 17}_0
c  in DIMACS:
-17498 -17499  17500 -944  17501 0
-17498 -17499  17500 -944 -17502 0
-17498 -17499  17500 -944  17503 0

c  -1+1 --> 0
c    ( b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0 ∧  p_944) -> (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧ -b^{59, 17}_0)
c  in CNF:
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_2
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_1
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_0
c  in DIMACS:
-17498  17499 -17500 -944 -17501 0
-17498  17499 -17500 -944 -17502 0
-17498  17499 -17500 -944 -17503 0

c  0+1 --> 1
c    (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧  p_944) -> (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0)
c  in CNF:
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_2
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_1
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨  b^{59, 17}_0
c  in DIMACS:
 17498  17499  17500 -944 -17501 0
 17498  17499  17500 -944 -17502 0
 17498  17499  17500 -944  17503 0

c  1+1 --> 2
c    (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0 ∧  p_944) -> (-b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0)
c  in CNF:
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_2
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨  b^{59, 17}_1
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ -p_944 ∨ -b^{59, 17}_0
c  in DIMACS:
 17498  17499 -17500 -944 -17501 0
 17498  17499 -17500 -944  17502 0
 17498  17499 -17500 -944 -17503 0

c  2+1 --> break 
c    (-b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧  p_944) -> break
c  in CNF:
c     b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 17498 -17499  17500 -944 1162 0


c  2-1 --> 1
c    (-b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧ -p_944) -> (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0)
c  in CNF:
c     b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_2
c     b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_1
c     b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨  b^{59, 17}_0
c  in DIMACS:
 17498 -17499  17500  944 -17501 0
 17498 -17499  17500  944 -17502 0
 17498 -17499  17500  944  17503 0

c  1-1 --> 0
c    (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0 ∧ -p_944) -> (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧ -b^{59, 17}_0)
c  in CNF:
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_2
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_1
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_0
c  in DIMACS:
 17498  17499 -17500  944 -17501 0
 17498  17499 -17500  944 -17502 0
 17498  17499 -17500  944 -17503 0

c  0-1 --> -1
c    (-b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧ -p_944) -> ( b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0)
c  in CNF:
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨  b^{59, 17}_2
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_1
c     b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨  b^{59, 17}_0
c  in DIMACS:
 17498  17499  17500  944  17501 0
 17498  17499  17500  944 -17502 0
 17498  17499  17500  944  17503 0

c  -1-1 --> -2
c    ( b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧  b^{59, 16}_0 ∧ -p_944) -> ( b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0)
c  in CNF:
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨  b^{59, 17}_2
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨  b^{59, 17}_1
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨  p_944 ∨ -b^{59, 17}_0
c  in DIMACS:
-17498  17499 -17500  944  17501 0
-17498  17499 -17500  944  17502 0
-17498  17499 -17500  944 -17503 0

c  -2-1 --> break 
c    ( b^{59, 16}_2 ∧  b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨  b^{59, 16}_0 ∨  p_944 ∨ break
c  in DIMACS:
-17498 -17499  17500  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 16}_2 ∧ -b^{59, 16}_1 ∧ -b^{59, 16}_0 ∧ true) 
c  in CNF:
c    -b^{59, 16}_2 ∨  b^{59, 16}_1 ∨  b^{59, 16}_0 ∨ false 
c  in DIMACS:
-17498  17499  17500  0

c  3 does not represent an automaton state.
c    -(-b^{59, 16}_2 ∧  b^{59, 16}_1 ∧  b^{59, 16}_0 ∧ true) 
c  in CNF:
c     b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ false 
c  in DIMACS:
 17498 -17499 -17500  0
c  -3 does not represent an automaton state.
c    -( b^{59, 16}_2 ∧  b^{59, 16}_1 ∧  b^{59, 16}_0 ∧ true) 
c  in CNF:
c    -b^{59, 16}_2 ∨ -b^{59, 16}_1 ∨ -b^{59, 16}_0 ∨ false 
c  in DIMACS:
-17498 -17499 -17500  0

c i = 17
c  -2+1 --> -1
c    ( b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧  p_1003) -> ( b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0)
c  in CNF:
c    -b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨  b^{59, 18}_2
c    -b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_1
c    -b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨  b^{59, 18}_0
c  in DIMACS:
-17501 -17502  17503 -1003  17504 0
-17501 -17502  17503 -1003 -17505 0
-17501 -17502  17503 -1003  17506 0

c  -1+1 --> 0
c    ( b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0 ∧  p_1003) -> (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧ -b^{59, 18}_0)
c  in CNF:
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_2
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_1
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_0
c  in DIMACS:
-17501  17502 -17503 -1003 -17504 0
-17501  17502 -17503 -1003 -17505 0
-17501  17502 -17503 -1003 -17506 0

c  0+1 --> 1
c    (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧  p_1003) -> (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0)
c  in CNF:
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_2
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_1
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨  b^{59, 18}_0
c  in DIMACS:
 17501  17502  17503 -1003 -17504 0
 17501  17502  17503 -1003 -17505 0
 17501  17502  17503 -1003  17506 0

c  1+1 --> 2
c    (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0 ∧  p_1003) -> (-b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0)
c  in CNF:
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_2
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨  b^{59, 18}_1
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ -p_1003 ∨ -b^{59, 18}_0
c  in DIMACS:
 17501  17502 -17503 -1003 -17504 0
 17501  17502 -17503 -1003  17505 0
 17501  17502 -17503 -1003 -17506 0

c  2+1 --> break 
c    (-b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧  p_1003) -> break
c  in CNF:
c     b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ -p_1003 ∨ break
c  in DIMACS:
 17501 -17502  17503 -1003 1162 0


c  2-1 --> 1
c    (-b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧ -p_1003) -> (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0)
c  in CNF:
c     b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_2
c     b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_1
c     b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨  b^{59, 18}_0
c  in DIMACS:
 17501 -17502  17503  1003 -17504 0
 17501 -17502  17503  1003 -17505 0
 17501 -17502  17503  1003  17506 0

c  1-1 --> 0
c    (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0 ∧ -p_1003) -> (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧ -b^{59, 18}_0)
c  in CNF:
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_2
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_1
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_0
c  in DIMACS:
 17501  17502 -17503  1003 -17504 0
 17501  17502 -17503  1003 -17505 0
 17501  17502 -17503  1003 -17506 0

c  0-1 --> -1
c    (-b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧ -p_1003) -> ( b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0)
c  in CNF:
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨  b^{59, 18}_2
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_1
c     b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨  b^{59, 18}_0
c  in DIMACS:
 17501  17502  17503  1003  17504 0
 17501  17502  17503  1003 -17505 0
 17501  17502  17503  1003  17506 0

c  -1-1 --> -2
c    ( b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧  b^{59, 17}_0 ∧ -p_1003) -> ( b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0)
c  in CNF:
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨  b^{59, 18}_2
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨  b^{59, 18}_1
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨  p_1003 ∨ -b^{59, 18}_0
c  in DIMACS:
-17501  17502 -17503  1003  17504 0
-17501  17502 -17503  1003  17505 0
-17501  17502 -17503  1003 -17506 0

c  -2-1 --> break 
c    ( b^{59, 17}_2 ∧  b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧ -p_1003) -> break
c  in CNF:
c    -b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨  b^{59, 17}_0 ∨  p_1003 ∨ break
c  in DIMACS:
-17501 -17502  17503  1003 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 17}_2 ∧ -b^{59, 17}_1 ∧ -b^{59, 17}_0 ∧ true) 
c  in CNF:
c    -b^{59, 17}_2 ∨  b^{59, 17}_1 ∨  b^{59, 17}_0 ∨ false 
c  in DIMACS:
-17501  17502  17503  0

c  3 does not represent an automaton state.
c    -(-b^{59, 17}_2 ∧  b^{59, 17}_1 ∧  b^{59, 17}_0 ∧ true) 
c  in CNF:
c     b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ false 
c  in DIMACS:
 17501 -17502 -17503  0
c  -3 does not represent an automaton state.
c    -( b^{59, 17}_2 ∧  b^{59, 17}_1 ∧  b^{59, 17}_0 ∧ true) 
c  in CNF:
c    -b^{59, 17}_2 ∨ -b^{59, 17}_1 ∨ -b^{59, 17}_0 ∨ false 
c  in DIMACS:
-17501 -17502 -17503  0

c i = 18
c  -2+1 --> -1
c    ( b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧  p_1062) -> ( b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0)
c  in CNF:
c    -b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨  b^{59, 19}_2
c    -b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_1
c    -b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨  b^{59, 19}_0
c  in DIMACS:
-17504 -17505  17506 -1062  17507 0
-17504 -17505  17506 -1062 -17508 0
-17504 -17505  17506 -1062  17509 0

c  -1+1 --> 0
c    ( b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0 ∧  p_1062) -> (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧ -b^{59, 19}_0)
c  in CNF:
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_2
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_1
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_0
c  in DIMACS:
-17504  17505 -17506 -1062 -17507 0
-17504  17505 -17506 -1062 -17508 0
-17504  17505 -17506 -1062 -17509 0

c  0+1 --> 1
c    (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧  p_1062) -> (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0)
c  in CNF:
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_2
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_1
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨  b^{59, 19}_0
c  in DIMACS:
 17504  17505  17506 -1062 -17507 0
 17504  17505  17506 -1062 -17508 0
 17504  17505  17506 -1062  17509 0

c  1+1 --> 2
c    (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0 ∧  p_1062) -> (-b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0)
c  in CNF:
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_2
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨  b^{59, 19}_1
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ -p_1062 ∨ -b^{59, 19}_0
c  in DIMACS:
 17504  17505 -17506 -1062 -17507 0
 17504  17505 -17506 -1062  17508 0
 17504  17505 -17506 -1062 -17509 0

c  2+1 --> break 
c    (-b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 17504 -17505  17506 -1062 1162 0


c  2-1 --> 1
c    (-b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧ -p_1062) -> (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0)
c  in CNF:
c     b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_2
c     b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_1
c     b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨  b^{59, 19}_0
c  in DIMACS:
 17504 -17505  17506  1062 -17507 0
 17504 -17505  17506  1062 -17508 0
 17504 -17505  17506  1062  17509 0

c  1-1 --> 0
c    (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0 ∧ -p_1062) -> (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧ -b^{59, 19}_0)
c  in CNF:
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_2
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_1
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_0
c  in DIMACS:
 17504  17505 -17506  1062 -17507 0
 17504  17505 -17506  1062 -17508 0
 17504  17505 -17506  1062 -17509 0

c  0-1 --> -1
c    (-b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧ -p_1062) -> ( b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0)
c  in CNF:
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨  b^{59, 19}_2
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_1
c     b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨  b^{59, 19}_0
c  in DIMACS:
 17504  17505  17506  1062  17507 0
 17504  17505  17506  1062 -17508 0
 17504  17505  17506  1062  17509 0

c  -1-1 --> -2
c    ( b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧  b^{59, 18}_0 ∧ -p_1062) -> ( b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0)
c  in CNF:
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨  b^{59, 19}_2
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨  b^{59, 19}_1
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨  p_1062 ∨ -b^{59, 19}_0
c  in DIMACS:
-17504  17505 -17506  1062  17507 0
-17504  17505 -17506  1062  17508 0
-17504  17505 -17506  1062 -17509 0

c  -2-1 --> break 
c    ( b^{59, 18}_2 ∧  b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨  b^{59, 18}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-17504 -17505  17506  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 18}_2 ∧ -b^{59, 18}_1 ∧ -b^{59, 18}_0 ∧ true) 
c  in CNF:
c    -b^{59, 18}_2 ∨  b^{59, 18}_1 ∨  b^{59, 18}_0 ∨ false 
c  in DIMACS:
-17504  17505  17506  0

c  3 does not represent an automaton state.
c    -(-b^{59, 18}_2 ∧  b^{59, 18}_1 ∧  b^{59, 18}_0 ∧ true) 
c  in CNF:
c     b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ false 
c  in DIMACS:
 17504 -17505 -17506  0
c  -3 does not represent an automaton state.
c    -( b^{59, 18}_2 ∧  b^{59, 18}_1 ∧  b^{59, 18}_0 ∧ true) 
c  in CNF:
c    -b^{59, 18}_2 ∨ -b^{59, 18}_1 ∨ -b^{59, 18}_0 ∨ false 
c  in DIMACS:
-17504 -17505 -17506  0

c i = 19
c  -2+1 --> -1
c    ( b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧  p_1121) -> ( b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧  b^{59, 20}_0)
c  in CNF:
c    -b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨  b^{59, 20}_2
c    -b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_1
c    -b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨  b^{59, 20}_0
c  in DIMACS:
-17507 -17508  17509 -1121  17510 0
-17507 -17508  17509 -1121 -17511 0
-17507 -17508  17509 -1121  17512 0

c  -1+1 --> 0
c    ( b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0 ∧  p_1121) -> (-b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧ -b^{59, 20}_0)
c  in CNF:
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_2
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_1
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_0
c  in DIMACS:
-17507  17508 -17509 -1121 -17510 0
-17507  17508 -17509 -1121 -17511 0
-17507  17508 -17509 -1121 -17512 0

c  0+1 --> 1
c    (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧  p_1121) -> (-b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧  b^{59, 20}_0)
c  in CNF:
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_2
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_1
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨  b^{59, 20}_0
c  in DIMACS:
 17507  17508  17509 -1121 -17510 0
 17507  17508  17509 -1121 -17511 0
 17507  17508  17509 -1121  17512 0

c  1+1 --> 2
c    (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0 ∧  p_1121) -> (-b^{59, 20}_2 ∧  b^{59, 20}_1 ∧ -b^{59, 20}_0)
c  in CNF:
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_2
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨  b^{59, 20}_1
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ -p_1121 ∨ -b^{59, 20}_0
c  in DIMACS:
 17507  17508 -17509 -1121 -17510 0
 17507  17508 -17509 -1121  17511 0
 17507  17508 -17509 -1121 -17512 0

c  2+1 --> break 
c    (-b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧  p_1121) -> break
c  in CNF:
c     b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ -p_1121 ∨ break
c  in DIMACS:
 17507 -17508  17509 -1121 1162 0


c  2-1 --> 1
c    (-b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧ -p_1121) -> (-b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧  b^{59, 20}_0)
c  in CNF:
c     b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_2
c     b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_1
c     b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨  b^{59, 20}_0
c  in DIMACS:
 17507 -17508  17509  1121 -17510 0
 17507 -17508  17509  1121 -17511 0
 17507 -17508  17509  1121  17512 0

c  1-1 --> 0
c    (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0 ∧ -p_1121) -> (-b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧ -b^{59, 20}_0)
c  in CNF:
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_2
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_1
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_0
c  in DIMACS:
 17507  17508 -17509  1121 -17510 0
 17507  17508 -17509  1121 -17511 0
 17507  17508 -17509  1121 -17512 0

c  0-1 --> -1
c    (-b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧ -p_1121) -> ( b^{59, 20}_2 ∧ -b^{59, 20}_1 ∧  b^{59, 20}_0)
c  in CNF:
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨  b^{59, 20}_2
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_1
c     b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨  b^{59, 20}_0
c  in DIMACS:
 17507  17508  17509  1121  17510 0
 17507  17508  17509  1121 -17511 0
 17507  17508  17509  1121  17512 0

c  -1-1 --> -2
c    ( b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧  b^{59, 19}_0 ∧ -p_1121) -> ( b^{59, 20}_2 ∧  b^{59, 20}_1 ∧ -b^{59, 20}_0)
c  in CNF:
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨  b^{59, 20}_2
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨  b^{59, 20}_1
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨  p_1121 ∨ -b^{59, 20}_0
c  in DIMACS:
-17507  17508 -17509  1121  17510 0
-17507  17508 -17509  1121  17511 0
-17507  17508 -17509  1121 -17512 0

c  -2-1 --> break 
c    ( b^{59, 19}_2 ∧  b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧ -p_1121) -> break
c  in CNF:
c    -b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨  b^{59, 19}_0 ∨  p_1121 ∨ break
c  in DIMACS:
-17507 -17508  17509  1121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{59, 19}_2 ∧ -b^{59, 19}_1 ∧ -b^{59, 19}_0 ∧ true) 
c  in CNF:
c    -b^{59, 19}_2 ∨  b^{59, 19}_1 ∨  b^{59, 19}_0 ∨ false 
c  in DIMACS:
-17507  17508  17509  0

c  3 does not represent an automaton state.
c    -(-b^{59, 19}_2 ∧  b^{59, 19}_1 ∧  b^{59, 19}_0 ∧ true) 
c  in CNF:
c     b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ false 
c  in DIMACS:
 17507 -17508 -17509  0
c  -3 does not represent an automaton state.
c    -( b^{59, 19}_2 ∧  b^{59, 19}_1 ∧  b^{59, 19}_0 ∧ true) 
c  in CNF:
c    -b^{59, 19}_2 ∨ -b^{59, 19}_1 ∨ -b^{59, 19}_0 ∨ false 
c  in DIMACS:
-17507 -17508 -17509  0

c INIT for k = 60
c    -b^{60, 1}_2
c    -b^{60, 1}_1
c    -b^{60, 1}_0
c  in DIMACS:
-17513 0
-17514 0
-17515 0

c Transitions for k = 60
c i = 1
c  -2+1 --> -1
c    ( b^{60, 1}_2 ∧  b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧  p_60) -> ( b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0)
c  in CNF:
c    -b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨  b^{60, 2}_2
c    -b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_1
c    -b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨  b^{60, 2}_0
c  in DIMACS:
-17513 -17514  17515 -60  17516 0
-17513 -17514  17515 -60 -17517 0
-17513 -17514  17515 -60  17518 0

c  -1+1 --> 0
c    ( b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧  b^{60, 1}_0 ∧  p_60) -> (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧ -b^{60, 2}_0)
c  in CNF:
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_2
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_1
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_0
c  in DIMACS:
-17513  17514 -17515 -60 -17516 0
-17513  17514 -17515 -60 -17517 0
-17513  17514 -17515 -60 -17518 0

c  0+1 --> 1
c    (-b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧  p_60) -> (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0)
c  in CNF:
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_2
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_1
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨  b^{60, 2}_0
c  in DIMACS:
 17513  17514  17515 -60 -17516 0
 17513  17514  17515 -60 -17517 0
 17513  17514  17515 -60  17518 0

c  1+1 --> 2
c    (-b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧  b^{60, 1}_0 ∧  p_60) -> (-b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0)
c  in CNF:
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_2
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨  b^{60, 2}_1
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ -p_60 ∨ -b^{60, 2}_0
c  in DIMACS:
 17513  17514 -17515 -60 -17516 0
 17513  17514 -17515 -60  17517 0
 17513  17514 -17515 -60 -17518 0

c  2+1 --> break 
c    (-b^{60, 1}_2 ∧  b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧  p_60) -> break
c  in CNF:
c     b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ -p_60 ∨ break
c  in DIMACS:
 17513 -17514  17515 -60 1162 0


c  2-1 --> 1
c    (-b^{60, 1}_2 ∧  b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧ -p_60) -> (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0)
c  in CNF:
c     b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_2
c     b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_1
c     b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨  b^{60, 2}_0
c  in DIMACS:
 17513 -17514  17515  60 -17516 0
 17513 -17514  17515  60 -17517 0
 17513 -17514  17515  60  17518 0

c  1-1 --> 0
c    (-b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧  b^{60, 1}_0 ∧ -p_60) -> (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧ -b^{60, 2}_0)
c  in CNF:
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_2
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_1
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_0
c  in DIMACS:
 17513  17514 -17515  60 -17516 0
 17513  17514 -17515  60 -17517 0
 17513  17514 -17515  60 -17518 0

c  0-1 --> -1
c    (-b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧ -p_60) -> ( b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0)
c  in CNF:
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨  b^{60, 2}_2
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_1
c     b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨  b^{60, 2}_0
c  in DIMACS:
 17513  17514  17515  60  17516 0
 17513  17514  17515  60 -17517 0
 17513  17514  17515  60  17518 0

c  -1-1 --> -2
c    ( b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧  b^{60, 1}_0 ∧ -p_60) -> ( b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0)
c  in CNF:
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨  b^{60, 2}_2
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨  b^{60, 2}_1
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨  p_60 ∨ -b^{60, 2}_0
c  in DIMACS:
-17513  17514 -17515  60  17516 0
-17513  17514 -17515  60  17517 0
-17513  17514 -17515  60 -17518 0

c  -2-1 --> break 
c    ( b^{60, 1}_2 ∧  b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧ -p_60) -> break
c  in CNF:
c    -b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨  b^{60, 1}_0 ∨  p_60 ∨ break
c  in DIMACS:
-17513 -17514  17515  60 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 1}_2 ∧ -b^{60, 1}_1 ∧ -b^{60, 1}_0 ∧ true) 
c  in CNF:
c    -b^{60, 1}_2 ∨  b^{60, 1}_1 ∨  b^{60, 1}_0 ∨ false 
c  in DIMACS:
-17513  17514  17515  0

c  3 does not represent an automaton state.
c    -(-b^{60, 1}_2 ∧  b^{60, 1}_1 ∧  b^{60, 1}_0 ∧ true) 
c  in CNF:
c     b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ false 
c  in DIMACS:
 17513 -17514 -17515  0
c  -3 does not represent an automaton state.
c    -( b^{60, 1}_2 ∧  b^{60, 1}_1 ∧  b^{60, 1}_0 ∧ true) 
c  in CNF:
c    -b^{60, 1}_2 ∨ -b^{60, 1}_1 ∨ -b^{60, 1}_0 ∨ false 
c  in DIMACS:
-17513 -17514 -17515  0

c i = 2
c  -2+1 --> -1
c    ( b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧  p_120) -> ( b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0)
c  in CNF:
c    -b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨  b^{60, 3}_2
c    -b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_1
c    -b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨  b^{60, 3}_0
c  in DIMACS:
-17516 -17517  17518 -120  17519 0
-17516 -17517  17518 -120 -17520 0
-17516 -17517  17518 -120  17521 0

c  -1+1 --> 0
c    ( b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0 ∧  p_120) -> (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧ -b^{60, 3}_0)
c  in CNF:
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_2
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_1
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_0
c  in DIMACS:
-17516  17517 -17518 -120 -17519 0
-17516  17517 -17518 -120 -17520 0
-17516  17517 -17518 -120 -17521 0

c  0+1 --> 1
c    (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧  p_120) -> (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0)
c  in CNF:
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_2
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_1
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨  b^{60, 3}_0
c  in DIMACS:
 17516  17517  17518 -120 -17519 0
 17516  17517  17518 -120 -17520 0
 17516  17517  17518 -120  17521 0

c  1+1 --> 2
c    (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0 ∧  p_120) -> (-b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0)
c  in CNF:
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_2
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨  b^{60, 3}_1
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ -p_120 ∨ -b^{60, 3}_0
c  in DIMACS:
 17516  17517 -17518 -120 -17519 0
 17516  17517 -17518 -120  17520 0
 17516  17517 -17518 -120 -17521 0

c  2+1 --> break 
c    (-b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧  p_120) -> break
c  in CNF:
c     b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 17516 -17517  17518 -120 1162 0


c  2-1 --> 1
c    (-b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧ -p_120) -> (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0)
c  in CNF:
c     b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_2
c     b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_1
c     b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨  b^{60, 3}_0
c  in DIMACS:
 17516 -17517  17518  120 -17519 0
 17516 -17517  17518  120 -17520 0
 17516 -17517  17518  120  17521 0

c  1-1 --> 0
c    (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0 ∧ -p_120) -> (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧ -b^{60, 3}_0)
c  in CNF:
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_2
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_1
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_0
c  in DIMACS:
 17516  17517 -17518  120 -17519 0
 17516  17517 -17518  120 -17520 0
 17516  17517 -17518  120 -17521 0

c  0-1 --> -1
c    (-b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧ -p_120) -> ( b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0)
c  in CNF:
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨  b^{60, 3}_2
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_1
c     b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨  b^{60, 3}_0
c  in DIMACS:
 17516  17517  17518  120  17519 0
 17516  17517  17518  120 -17520 0
 17516  17517  17518  120  17521 0

c  -1-1 --> -2
c    ( b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧  b^{60, 2}_0 ∧ -p_120) -> ( b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0)
c  in CNF:
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨  b^{60, 3}_2
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨  b^{60, 3}_1
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨  p_120 ∨ -b^{60, 3}_0
c  in DIMACS:
-17516  17517 -17518  120  17519 0
-17516  17517 -17518  120  17520 0
-17516  17517 -17518  120 -17521 0

c  -2-1 --> break 
c    ( b^{60, 2}_2 ∧  b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨  b^{60, 2}_0 ∨  p_120 ∨ break
c  in DIMACS:
-17516 -17517  17518  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 2}_2 ∧ -b^{60, 2}_1 ∧ -b^{60, 2}_0 ∧ true) 
c  in CNF:
c    -b^{60, 2}_2 ∨  b^{60, 2}_1 ∨  b^{60, 2}_0 ∨ false 
c  in DIMACS:
-17516  17517  17518  0

c  3 does not represent an automaton state.
c    -(-b^{60, 2}_2 ∧  b^{60, 2}_1 ∧  b^{60, 2}_0 ∧ true) 
c  in CNF:
c     b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ false 
c  in DIMACS:
 17516 -17517 -17518  0
c  -3 does not represent an automaton state.
c    -( b^{60, 2}_2 ∧  b^{60, 2}_1 ∧  b^{60, 2}_0 ∧ true) 
c  in CNF:
c    -b^{60, 2}_2 ∨ -b^{60, 2}_1 ∨ -b^{60, 2}_0 ∨ false 
c  in DIMACS:
-17516 -17517 -17518  0

c i = 3
c  -2+1 --> -1
c    ( b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧  p_180) -> ( b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0)
c  in CNF:
c    -b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨  b^{60, 4}_2
c    -b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_1
c    -b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨  b^{60, 4}_0
c  in DIMACS:
-17519 -17520  17521 -180  17522 0
-17519 -17520  17521 -180 -17523 0
-17519 -17520  17521 -180  17524 0

c  -1+1 --> 0
c    ( b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0 ∧  p_180) -> (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧ -b^{60, 4}_0)
c  in CNF:
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_2
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_1
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_0
c  in DIMACS:
-17519  17520 -17521 -180 -17522 0
-17519  17520 -17521 -180 -17523 0
-17519  17520 -17521 -180 -17524 0

c  0+1 --> 1
c    (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧  p_180) -> (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0)
c  in CNF:
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_2
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_1
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨  b^{60, 4}_0
c  in DIMACS:
 17519  17520  17521 -180 -17522 0
 17519  17520  17521 -180 -17523 0
 17519  17520  17521 -180  17524 0

c  1+1 --> 2
c    (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0 ∧  p_180) -> (-b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0)
c  in CNF:
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_2
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨  b^{60, 4}_1
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ -p_180 ∨ -b^{60, 4}_0
c  in DIMACS:
 17519  17520 -17521 -180 -17522 0
 17519  17520 -17521 -180  17523 0
 17519  17520 -17521 -180 -17524 0

c  2+1 --> break 
c    (-b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧  p_180) -> break
c  in CNF:
c     b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 17519 -17520  17521 -180 1162 0


c  2-1 --> 1
c    (-b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧ -p_180) -> (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0)
c  in CNF:
c     b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_2
c     b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_1
c     b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨  b^{60, 4}_0
c  in DIMACS:
 17519 -17520  17521  180 -17522 0
 17519 -17520  17521  180 -17523 0
 17519 -17520  17521  180  17524 0

c  1-1 --> 0
c    (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0 ∧ -p_180) -> (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧ -b^{60, 4}_0)
c  in CNF:
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_2
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_1
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_0
c  in DIMACS:
 17519  17520 -17521  180 -17522 0
 17519  17520 -17521  180 -17523 0
 17519  17520 -17521  180 -17524 0

c  0-1 --> -1
c    (-b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧ -p_180) -> ( b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0)
c  in CNF:
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨  b^{60, 4}_2
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_1
c     b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨  b^{60, 4}_0
c  in DIMACS:
 17519  17520  17521  180  17522 0
 17519  17520  17521  180 -17523 0
 17519  17520  17521  180  17524 0

c  -1-1 --> -2
c    ( b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧  b^{60, 3}_0 ∧ -p_180) -> ( b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0)
c  in CNF:
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨  b^{60, 4}_2
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨  b^{60, 4}_1
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨  p_180 ∨ -b^{60, 4}_0
c  in DIMACS:
-17519  17520 -17521  180  17522 0
-17519  17520 -17521  180  17523 0
-17519  17520 -17521  180 -17524 0

c  -2-1 --> break 
c    ( b^{60, 3}_2 ∧  b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨  b^{60, 3}_0 ∨  p_180 ∨ break
c  in DIMACS:
-17519 -17520  17521  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 3}_2 ∧ -b^{60, 3}_1 ∧ -b^{60, 3}_0 ∧ true) 
c  in CNF:
c    -b^{60, 3}_2 ∨  b^{60, 3}_1 ∨  b^{60, 3}_0 ∨ false 
c  in DIMACS:
-17519  17520  17521  0

c  3 does not represent an automaton state.
c    -(-b^{60, 3}_2 ∧  b^{60, 3}_1 ∧  b^{60, 3}_0 ∧ true) 
c  in CNF:
c     b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ false 
c  in DIMACS:
 17519 -17520 -17521  0
c  -3 does not represent an automaton state.
c    -( b^{60, 3}_2 ∧  b^{60, 3}_1 ∧  b^{60, 3}_0 ∧ true) 
c  in CNF:
c    -b^{60, 3}_2 ∨ -b^{60, 3}_1 ∨ -b^{60, 3}_0 ∨ false 
c  in DIMACS:
-17519 -17520 -17521  0

c i = 4
c  -2+1 --> -1
c    ( b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧  p_240) -> ( b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0)
c  in CNF:
c    -b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨  b^{60, 5}_2
c    -b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_1
c    -b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨  b^{60, 5}_0
c  in DIMACS:
-17522 -17523  17524 -240  17525 0
-17522 -17523  17524 -240 -17526 0
-17522 -17523  17524 -240  17527 0

c  -1+1 --> 0
c    ( b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0 ∧  p_240) -> (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧ -b^{60, 5}_0)
c  in CNF:
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_2
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_1
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_0
c  in DIMACS:
-17522  17523 -17524 -240 -17525 0
-17522  17523 -17524 -240 -17526 0
-17522  17523 -17524 -240 -17527 0

c  0+1 --> 1
c    (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧  p_240) -> (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0)
c  in CNF:
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_2
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_1
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨  b^{60, 5}_0
c  in DIMACS:
 17522  17523  17524 -240 -17525 0
 17522  17523  17524 -240 -17526 0
 17522  17523  17524 -240  17527 0

c  1+1 --> 2
c    (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0 ∧  p_240) -> (-b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0)
c  in CNF:
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_2
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨  b^{60, 5}_1
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ -p_240 ∨ -b^{60, 5}_0
c  in DIMACS:
 17522  17523 -17524 -240 -17525 0
 17522  17523 -17524 -240  17526 0
 17522  17523 -17524 -240 -17527 0

c  2+1 --> break 
c    (-b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧  p_240) -> break
c  in CNF:
c     b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 17522 -17523  17524 -240 1162 0


c  2-1 --> 1
c    (-b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧ -p_240) -> (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0)
c  in CNF:
c     b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_2
c     b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_1
c     b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨  b^{60, 5}_0
c  in DIMACS:
 17522 -17523  17524  240 -17525 0
 17522 -17523  17524  240 -17526 0
 17522 -17523  17524  240  17527 0

c  1-1 --> 0
c    (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0 ∧ -p_240) -> (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧ -b^{60, 5}_0)
c  in CNF:
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_2
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_1
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_0
c  in DIMACS:
 17522  17523 -17524  240 -17525 0
 17522  17523 -17524  240 -17526 0
 17522  17523 -17524  240 -17527 0

c  0-1 --> -1
c    (-b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧ -p_240) -> ( b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0)
c  in CNF:
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨  b^{60, 5}_2
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_1
c     b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨  b^{60, 5}_0
c  in DIMACS:
 17522  17523  17524  240  17525 0
 17522  17523  17524  240 -17526 0
 17522  17523  17524  240  17527 0

c  -1-1 --> -2
c    ( b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧  b^{60, 4}_0 ∧ -p_240) -> ( b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0)
c  in CNF:
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨  b^{60, 5}_2
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨  b^{60, 5}_1
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨  p_240 ∨ -b^{60, 5}_0
c  in DIMACS:
-17522  17523 -17524  240  17525 0
-17522  17523 -17524  240  17526 0
-17522  17523 -17524  240 -17527 0

c  -2-1 --> break 
c    ( b^{60, 4}_2 ∧  b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨  b^{60, 4}_0 ∨  p_240 ∨ break
c  in DIMACS:
-17522 -17523  17524  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 4}_2 ∧ -b^{60, 4}_1 ∧ -b^{60, 4}_0 ∧ true) 
c  in CNF:
c    -b^{60, 4}_2 ∨  b^{60, 4}_1 ∨  b^{60, 4}_0 ∨ false 
c  in DIMACS:
-17522  17523  17524  0

c  3 does not represent an automaton state.
c    -(-b^{60, 4}_2 ∧  b^{60, 4}_1 ∧  b^{60, 4}_0 ∧ true) 
c  in CNF:
c     b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ false 
c  in DIMACS:
 17522 -17523 -17524  0
c  -3 does not represent an automaton state.
c    -( b^{60, 4}_2 ∧  b^{60, 4}_1 ∧  b^{60, 4}_0 ∧ true) 
c  in CNF:
c    -b^{60, 4}_2 ∨ -b^{60, 4}_1 ∨ -b^{60, 4}_0 ∨ false 
c  in DIMACS:
-17522 -17523 -17524  0

c i = 5
c  -2+1 --> -1
c    ( b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧  p_300) -> ( b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0)
c  in CNF:
c    -b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨  b^{60, 6}_2
c    -b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_1
c    -b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨  b^{60, 6}_0
c  in DIMACS:
-17525 -17526  17527 -300  17528 0
-17525 -17526  17527 -300 -17529 0
-17525 -17526  17527 -300  17530 0

c  -1+1 --> 0
c    ( b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0 ∧  p_300) -> (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧ -b^{60, 6}_0)
c  in CNF:
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_2
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_1
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_0
c  in DIMACS:
-17525  17526 -17527 -300 -17528 0
-17525  17526 -17527 -300 -17529 0
-17525  17526 -17527 -300 -17530 0

c  0+1 --> 1
c    (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧  p_300) -> (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0)
c  in CNF:
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_2
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_1
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨  b^{60, 6}_0
c  in DIMACS:
 17525  17526  17527 -300 -17528 0
 17525  17526  17527 -300 -17529 0
 17525  17526  17527 -300  17530 0

c  1+1 --> 2
c    (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0 ∧  p_300) -> (-b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0)
c  in CNF:
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_2
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨  b^{60, 6}_1
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ -p_300 ∨ -b^{60, 6}_0
c  in DIMACS:
 17525  17526 -17527 -300 -17528 0
 17525  17526 -17527 -300  17529 0
 17525  17526 -17527 -300 -17530 0

c  2+1 --> break 
c    (-b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧  p_300) -> break
c  in CNF:
c     b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 17525 -17526  17527 -300 1162 0


c  2-1 --> 1
c    (-b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧ -p_300) -> (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0)
c  in CNF:
c     b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_2
c     b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_1
c     b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨  b^{60, 6}_0
c  in DIMACS:
 17525 -17526  17527  300 -17528 0
 17525 -17526  17527  300 -17529 0
 17525 -17526  17527  300  17530 0

c  1-1 --> 0
c    (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0 ∧ -p_300) -> (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧ -b^{60, 6}_0)
c  in CNF:
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_2
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_1
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_0
c  in DIMACS:
 17525  17526 -17527  300 -17528 0
 17525  17526 -17527  300 -17529 0
 17525  17526 -17527  300 -17530 0

c  0-1 --> -1
c    (-b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧ -p_300) -> ( b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0)
c  in CNF:
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨  b^{60, 6}_2
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_1
c     b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨  b^{60, 6}_0
c  in DIMACS:
 17525  17526  17527  300  17528 0
 17525  17526  17527  300 -17529 0
 17525  17526  17527  300  17530 0

c  -1-1 --> -2
c    ( b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧  b^{60, 5}_0 ∧ -p_300) -> ( b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0)
c  in CNF:
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨  b^{60, 6}_2
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨  b^{60, 6}_1
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨  p_300 ∨ -b^{60, 6}_0
c  in DIMACS:
-17525  17526 -17527  300  17528 0
-17525  17526 -17527  300  17529 0
-17525  17526 -17527  300 -17530 0

c  -2-1 --> break 
c    ( b^{60, 5}_2 ∧  b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨  b^{60, 5}_0 ∨  p_300 ∨ break
c  in DIMACS:
-17525 -17526  17527  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 5}_2 ∧ -b^{60, 5}_1 ∧ -b^{60, 5}_0 ∧ true) 
c  in CNF:
c    -b^{60, 5}_2 ∨  b^{60, 5}_1 ∨  b^{60, 5}_0 ∨ false 
c  in DIMACS:
-17525  17526  17527  0

c  3 does not represent an automaton state.
c    -(-b^{60, 5}_2 ∧  b^{60, 5}_1 ∧  b^{60, 5}_0 ∧ true) 
c  in CNF:
c     b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ false 
c  in DIMACS:
 17525 -17526 -17527  0
c  -3 does not represent an automaton state.
c    -( b^{60, 5}_2 ∧  b^{60, 5}_1 ∧  b^{60, 5}_0 ∧ true) 
c  in CNF:
c    -b^{60, 5}_2 ∨ -b^{60, 5}_1 ∨ -b^{60, 5}_0 ∨ false 
c  in DIMACS:
-17525 -17526 -17527  0

c i = 6
c  -2+1 --> -1
c    ( b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧  p_360) -> ( b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0)
c  in CNF:
c    -b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨  b^{60, 7}_2
c    -b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_1
c    -b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨  b^{60, 7}_0
c  in DIMACS:
-17528 -17529  17530 -360  17531 0
-17528 -17529  17530 -360 -17532 0
-17528 -17529  17530 -360  17533 0

c  -1+1 --> 0
c    ( b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0 ∧  p_360) -> (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧ -b^{60, 7}_0)
c  in CNF:
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_2
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_1
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_0
c  in DIMACS:
-17528  17529 -17530 -360 -17531 0
-17528  17529 -17530 -360 -17532 0
-17528  17529 -17530 -360 -17533 0

c  0+1 --> 1
c    (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧  p_360) -> (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0)
c  in CNF:
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_2
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_1
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨  b^{60, 7}_0
c  in DIMACS:
 17528  17529  17530 -360 -17531 0
 17528  17529  17530 -360 -17532 0
 17528  17529  17530 -360  17533 0

c  1+1 --> 2
c    (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0 ∧  p_360) -> (-b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0)
c  in CNF:
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_2
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨  b^{60, 7}_1
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ -p_360 ∨ -b^{60, 7}_0
c  in DIMACS:
 17528  17529 -17530 -360 -17531 0
 17528  17529 -17530 -360  17532 0
 17528  17529 -17530 -360 -17533 0

c  2+1 --> break 
c    (-b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧  p_360) -> break
c  in CNF:
c     b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 17528 -17529  17530 -360 1162 0


c  2-1 --> 1
c    (-b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧ -p_360) -> (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0)
c  in CNF:
c     b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_2
c     b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_1
c     b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨  b^{60, 7}_0
c  in DIMACS:
 17528 -17529  17530  360 -17531 0
 17528 -17529  17530  360 -17532 0
 17528 -17529  17530  360  17533 0

c  1-1 --> 0
c    (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0 ∧ -p_360) -> (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧ -b^{60, 7}_0)
c  in CNF:
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_2
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_1
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_0
c  in DIMACS:
 17528  17529 -17530  360 -17531 0
 17528  17529 -17530  360 -17532 0
 17528  17529 -17530  360 -17533 0

c  0-1 --> -1
c    (-b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧ -p_360) -> ( b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0)
c  in CNF:
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨  b^{60, 7}_2
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_1
c     b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨  b^{60, 7}_0
c  in DIMACS:
 17528  17529  17530  360  17531 0
 17528  17529  17530  360 -17532 0
 17528  17529  17530  360  17533 0

c  -1-1 --> -2
c    ( b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧  b^{60, 6}_0 ∧ -p_360) -> ( b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0)
c  in CNF:
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨  b^{60, 7}_2
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨  b^{60, 7}_1
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨  p_360 ∨ -b^{60, 7}_0
c  in DIMACS:
-17528  17529 -17530  360  17531 0
-17528  17529 -17530  360  17532 0
-17528  17529 -17530  360 -17533 0

c  -2-1 --> break 
c    ( b^{60, 6}_2 ∧  b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨  b^{60, 6}_0 ∨  p_360 ∨ break
c  in DIMACS:
-17528 -17529  17530  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 6}_2 ∧ -b^{60, 6}_1 ∧ -b^{60, 6}_0 ∧ true) 
c  in CNF:
c    -b^{60, 6}_2 ∨  b^{60, 6}_1 ∨  b^{60, 6}_0 ∨ false 
c  in DIMACS:
-17528  17529  17530  0

c  3 does not represent an automaton state.
c    -(-b^{60, 6}_2 ∧  b^{60, 6}_1 ∧  b^{60, 6}_0 ∧ true) 
c  in CNF:
c     b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ false 
c  in DIMACS:
 17528 -17529 -17530  0
c  -3 does not represent an automaton state.
c    -( b^{60, 6}_2 ∧  b^{60, 6}_1 ∧  b^{60, 6}_0 ∧ true) 
c  in CNF:
c    -b^{60, 6}_2 ∨ -b^{60, 6}_1 ∨ -b^{60, 6}_0 ∨ false 
c  in DIMACS:
-17528 -17529 -17530  0

c i = 7
c  -2+1 --> -1
c    ( b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧  p_420) -> ( b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0)
c  in CNF:
c    -b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨  b^{60, 8}_2
c    -b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_1
c    -b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨  b^{60, 8}_0
c  in DIMACS:
-17531 -17532  17533 -420  17534 0
-17531 -17532  17533 -420 -17535 0
-17531 -17532  17533 -420  17536 0

c  -1+1 --> 0
c    ( b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0 ∧  p_420) -> (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧ -b^{60, 8}_0)
c  in CNF:
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_2
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_1
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_0
c  in DIMACS:
-17531  17532 -17533 -420 -17534 0
-17531  17532 -17533 -420 -17535 0
-17531  17532 -17533 -420 -17536 0

c  0+1 --> 1
c    (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧  p_420) -> (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0)
c  in CNF:
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_2
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_1
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨  b^{60, 8}_0
c  in DIMACS:
 17531  17532  17533 -420 -17534 0
 17531  17532  17533 -420 -17535 0
 17531  17532  17533 -420  17536 0

c  1+1 --> 2
c    (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0 ∧  p_420) -> (-b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0)
c  in CNF:
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_2
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨  b^{60, 8}_1
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ -p_420 ∨ -b^{60, 8}_0
c  in DIMACS:
 17531  17532 -17533 -420 -17534 0
 17531  17532 -17533 -420  17535 0
 17531  17532 -17533 -420 -17536 0

c  2+1 --> break 
c    (-b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧  p_420) -> break
c  in CNF:
c     b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 17531 -17532  17533 -420 1162 0


c  2-1 --> 1
c    (-b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧ -p_420) -> (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0)
c  in CNF:
c     b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_2
c     b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_1
c     b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨  b^{60, 8}_0
c  in DIMACS:
 17531 -17532  17533  420 -17534 0
 17531 -17532  17533  420 -17535 0
 17531 -17532  17533  420  17536 0

c  1-1 --> 0
c    (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0 ∧ -p_420) -> (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧ -b^{60, 8}_0)
c  in CNF:
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_2
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_1
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_0
c  in DIMACS:
 17531  17532 -17533  420 -17534 0
 17531  17532 -17533  420 -17535 0
 17531  17532 -17533  420 -17536 0

c  0-1 --> -1
c    (-b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧ -p_420) -> ( b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0)
c  in CNF:
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨  b^{60, 8}_2
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_1
c     b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨  b^{60, 8}_0
c  in DIMACS:
 17531  17532  17533  420  17534 0
 17531  17532  17533  420 -17535 0
 17531  17532  17533  420  17536 0

c  -1-1 --> -2
c    ( b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧  b^{60, 7}_0 ∧ -p_420) -> ( b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0)
c  in CNF:
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨  b^{60, 8}_2
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨  b^{60, 8}_1
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨  p_420 ∨ -b^{60, 8}_0
c  in DIMACS:
-17531  17532 -17533  420  17534 0
-17531  17532 -17533  420  17535 0
-17531  17532 -17533  420 -17536 0

c  -2-1 --> break 
c    ( b^{60, 7}_2 ∧  b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨  b^{60, 7}_0 ∨  p_420 ∨ break
c  in DIMACS:
-17531 -17532  17533  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 7}_2 ∧ -b^{60, 7}_1 ∧ -b^{60, 7}_0 ∧ true) 
c  in CNF:
c    -b^{60, 7}_2 ∨  b^{60, 7}_1 ∨  b^{60, 7}_0 ∨ false 
c  in DIMACS:
-17531  17532  17533  0

c  3 does not represent an automaton state.
c    -(-b^{60, 7}_2 ∧  b^{60, 7}_1 ∧  b^{60, 7}_0 ∧ true) 
c  in CNF:
c     b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ false 
c  in DIMACS:
 17531 -17532 -17533  0
c  -3 does not represent an automaton state.
c    -( b^{60, 7}_2 ∧  b^{60, 7}_1 ∧  b^{60, 7}_0 ∧ true) 
c  in CNF:
c    -b^{60, 7}_2 ∨ -b^{60, 7}_1 ∨ -b^{60, 7}_0 ∨ false 
c  in DIMACS:
-17531 -17532 -17533  0

c i = 8
c  -2+1 --> -1
c    ( b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧  p_480) -> ( b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0)
c  in CNF:
c    -b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨  b^{60, 9}_2
c    -b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_1
c    -b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨  b^{60, 9}_0
c  in DIMACS:
-17534 -17535  17536 -480  17537 0
-17534 -17535  17536 -480 -17538 0
-17534 -17535  17536 -480  17539 0

c  -1+1 --> 0
c    ( b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0 ∧  p_480) -> (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧ -b^{60, 9}_0)
c  in CNF:
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_2
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_1
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_0
c  in DIMACS:
-17534  17535 -17536 -480 -17537 0
-17534  17535 -17536 -480 -17538 0
-17534  17535 -17536 -480 -17539 0

c  0+1 --> 1
c    (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧  p_480) -> (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0)
c  in CNF:
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_2
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_1
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨  b^{60, 9}_0
c  in DIMACS:
 17534  17535  17536 -480 -17537 0
 17534  17535  17536 -480 -17538 0
 17534  17535  17536 -480  17539 0

c  1+1 --> 2
c    (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0 ∧  p_480) -> (-b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0)
c  in CNF:
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_2
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨  b^{60, 9}_1
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ -p_480 ∨ -b^{60, 9}_0
c  in DIMACS:
 17534  17535 -17536 -480 -17537 0
 17534  17535 -17536 -480  17538 0
 17534  17535 -17536 -480 -17539 0

c  2+1 --> break 
c    (-b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧  p_480) -> break
c  in CNF:
c     b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 17534 -17535  17536 -480 1162 0


c  2-1 --> 1
c    (-b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧ -p_480) -> (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0)
c  in CNF:
c     b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_2
c     b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_1
c     b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨  b^{60, 9}_0
c  in DIMACS:
 17534 -17535  17536  480 -17537 0
 17534 -17535  17536  480 -17538 0
 17534 -17535  17536  480  17539 0

c  1-1 --> 0
c    (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0 ∧ -p_480) -> (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧ -b^{60, 9}_0)
c  in CNF:
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_2
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_1
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_0
c  in DIMACS:
 17534  17535 -17536  480 -17537 0
 17534  17535 -17536  480 -17538 0
 17534  17535 -17536  480 -17539 0

c  0-1 --> -1
c    (-b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧ -p_480) -> ( b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0)
c  in CNF:
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨  b^{60, 9}_2
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_1
c     b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨  b^{60, 9}_0
c  in DIMACS:
 17534  17535  17536  480  17537 0
 17534  17535  17536  480 -17538 0
 17534  17535  17536  480  17539 0

c  -1-1 --> -2
c    ( b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧  b^{60, 8}_0 ∧ -p_480) -> ( b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0)
c  in CNF:
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨  b^{60, 9}_2
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨  b^{60, 9}_1
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨  p_480 ∨ -b^{60, 9}_0
c  in DIMACS:
-17534  17535 -17536  480  17537 0
-17534  17535 -17536  480  17538 0
-17534  17535 -17536  480 -17539 0

c  -2-1 --> break 
c    ( b^{60, 8}_2 ∧  b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨  b^{60, 8}_0 ∨  p_480 ∨ break
c  in DIMACS:
-17534 -17535  17536  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 8}_2 ∧ -b^{60, 8}_1 ∧ -b^{60, 8}_0 ∧ true) 
c  in CNF:
c    -b^{60, 8}_2 ∨  b^{60, 8}_1 ∨  b^{60, 8}_0 ∨ false 
c  in DIMACS:
-17534  17535  17536  0

c  3 does not represent an automaton state.
c    -(-b^{60, 8}_2 ∧  b^{60, 8}_1 ∧  b^{60, 8}_0 ∧ true) 
c  in CNF:
c     b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ false 
c  in DIMACS:
 17534 -17535 -17536  0
c  -3 does not represent an automaton state.
c    -( b^{60, 8}_2 ∧  b^{60, 8}_1 ∧  b^{60, 8}_0 ∧ true) 
c  in CNF:
c    -b^{60, 8}_2 ∨ -b^{60, 8}_1 ∨ -b^{60, 8}_0 ∨ false 
c  in DIMACS:
-17534 -17535 -17536  0

c i = 9
c  -2+1 --> -1
c    ( b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧  p_540) -> ( b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0)
c  in CNF:
c    -b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨  b^{60, 10}_2
c    -b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_1
c    -b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨  b^{60, 10}_0
c  in DIMACS:
-17537 -17538  17539 -540  17540 0
-17537 -17538  17539 -540 -17541 0
-17537 -17538  17539 -540  17542 0

c  -1+1 --> 0
c    ( b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0 ∧  p_540) -> (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧ -b^{60, 10}_0)
c  in CNF:
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_2
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_1
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_0
c  in DIMACS:
-17537  17538 -17539 -540 -17540 0
-17537  17538 -17539 -540 -17541 0
-17537  17538 -17539 -540 -17542 0

c  0+1 --> 1
c    (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧  p_540) -> (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0)
c  in CNF:
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_2
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_1
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨  b^{60, 10}_0
c  in DIMACS:
 17537  17538  17539 -540 -17540 0
 17537  17538  17539 -540 -17541 0
 17537  17538  17539 -540  17542 0

c  1+1 --> 2
c    (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0 ∧  p_540) -> (-b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0)
c  in CNF:
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_2
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨  b^{60, 10}_1
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ -p_540 ∨ -b^{60, 10}_0
c  in DIMACS:
 17537  17538 -17539 -540 -17540 0
 17537  17538 -17539 -540  17541 0
 17537  17538 -17539 -540 -17542 0

c  2+1 --> break 
c    (-b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧  p_540) -> break
c  in CNF:
c     b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 17537 -17538  17539 -540 1162 0


c  2-1 --> 1
c    (-b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧ -p_540) -> (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0)
c  in CNF:
c     b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_2
c     b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_1
c     b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨  b^{60, 10}_0
c  in DIMACS:
 17537 -17538  17539  540 -17540 0
 17537 -17538  17539  540 -17541 0
 17537 -17538  17539  540  17542 0

c  1-1 --> 0
c    (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0 ∧ -p_540) -> (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧ -b^{60, 10}_0)
c  in CNF:
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_2
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_1
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_0
c  in DIMACS:
 17537  17538 -17539  540 -17540 0
 17537  17538 -17539  540 -17541 0
 17537  17538 -17539  540 -17542 0

c  0-1 --> -1
c    (-b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧ -p_540) -> ( b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0)
c  in CNF:
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨  b^{60, 10}_2
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_1
c     b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨  b^{60, 10}_0
c  in DIMACS:
 17537  17538  17539  540  17540 0
 17537  17538  17539  540 -17541 0
 17537  17538  17539  540  17542 0

c  -1-1 --> -2
c    ( b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧  b^{60, 9}_0 ∧ -p_540) -> ( b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0)
c  in CNF:
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨  b^{60, 10}_2
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨  b^{60, 10}_1
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨  p_540 ∨ -b^{60, 10}_0
c  in DIMACS:
-17537  17538 -17539  540  17540 0
-17537  17538 -17539  540  17541 0
-17537  17538 -17539  540 -17542 0

c  -2-1 --> break 
c    ( b^{60, 9}_2 ∧  b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨  b^{60, 9}_0 ∨  p_540 ∨ break
c  in DIMACS:
-17537 -17538  17539  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 9}_2 ∧ -b^{60, 9}_1 ∧ -b^{60, 9}_0 ∧ true) 
c  in CNF:
c    -b^{60, 9}_2 ∨  b^{60, 9}_1 ∨  b^{60, 9}_0 ∨ false 
c  in DIMACS:
-17537  17538  17539  0

c  3 does not represent an automaton state.
c    -(-b^{60, 9}_2 ∧  b^{60, 9}_1 ∧  b^{60, 9}_0 ∧ true) 
c  in CNF:
c     b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ false 
c  in DIMACS:
 17537 -17538 -17539  0
c  -3 does not represent an automaton state.
c    -( b^{60, 9}_2 ∧  b^{60, 9}_1 ∧  b^{60, 9}_0 ∧ true) 
c  in CNF:
c    -b^{60, 9}_2 ∨ -b^{60, 9}_1 ∨ -b^{60, 9}_0 ∨ false 
c  in DIMACS:
-17537 -17538 -17539  0

c i = 10
c  -2+1 --> -1
c    ( b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧  p_600) -> ( b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0)
c  in CNF:
c    -b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨  b^{60, 11}_2
c    -b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_1
c    -b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨  b^{60, 11}_0
c  in DIMACS:
-17540 -17541  17542 -600  17543 0
-17540 -17541  17542 -600 -17544 0
-17540 -17541  17542 -600  17545 0

c  -1+1 --> 0
c    ( b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0 ∧  p_600) -> (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧ -b^{60, 11}_0)
c  in CNF:
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_2
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_1
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_0
c  in DIMACS:
-17540  17541 -17542 -600 -17543 0
-17540  17541 -17542 -600 -17544 0
-17540  17541 -17542 -600 -17545 0

c  0+1 --> 1
c    (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧  p_600) -> (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0)
c  in CNF:
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_2
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_1
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨  b^{60, 11}_0
c  in DIMACS:
 17540  17541  17542 -600 -17543 0
 17540  17541  17542 -600 -17544 0
 17540  17541  17542 -600  17545 0

c  1+1 --> 2
c    (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0 ∧  p_600) -> (-b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0)
c  in CNF:
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_2
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨  b^{60, 11}_1
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ -p_600 ∨ -b^{60, 11}_0
c  in DIMACS:
 17540  17541 -17542 -600 -17543 0
 17540  17541 -17542 -600  17544 0
 17540  17541 -17542 -600 -17545 0

c  2+1 --> break 
c    (-b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧  p_600) -> break
c  in CNF:
c     b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 17540 -17541  17542 -600 1162 0


c  2-1 --> 1
c    (-b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧ -p_600) -> (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0)
c  in CNF:
c     b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_2
c     b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_1
c     b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨  b^{60, 11}_0
c  in DIMACS:
 17540 -17541  17542  600 -17543 0
 17540 -17541  17542  600 -17544 0
 17540 -17541  17542  600  17545 0

c  1-1 --> 0
c    (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0 ∧ -p_600) -> (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧ -b^{60, 11}_0)
c  in CNF:
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_2
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_1
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_0
c  in DIMACS:
 17540  17541 -17542  600 -17543 0
 17540  17541 -17542  600 -17544 0
 17540  17541 -17542  600 -17545 0

c  0-1 --> -1
c    (-b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧ -p_600) -> ( b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0)
c  in CNF:
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨  b^{60, 11}_2
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_1
c     b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨  b^{60, 11}_0
c  in DIMACS:
 17540  17541  17542  600  17543 0
 17540  17541  17542  600 -17544 0
 17540  17541  17542  600  17545 0

c  -1-1 --> -2
c    ( b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧  b^{60, 10}_0 ∧ -p_600) -> ( b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0)
c  in CNF:
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨  b^{60, 11}_2
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨  b^{60, 11}_1
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨  p_600 ∨ -b^{60, 11}_0
c  in DIMACS:
-17540  17541 -17542  600  17543 0
-17540  17541 -17542  600  17544 0
-17540  17541 -17542  600 -17545 0

c  -2-1 --> break 
c    ( b^{60, 10}_2 ∧  b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨  b^{60, 10}_0 ∨  p_600 ∨ break
c  in DIMACS:
-17540 -17541  17542  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 10}_2 ∧ -b^{60, 10}_1 ∧ -b^{60, 10}_0 ∧ true) 
c  in CNF:
c    -b^{60, 10}_2 ∨  b^{60, 10}_1 ∨  b^{60, 10}_0 ∨ false 
c  in DIMACS:
-17540  17541  17542  0

c  3 does not represent an automaton state.
c    -(-b^{60, 10}_2 ∧  b^{60, 10}_1 ∧  b^{60, 10}_0 ∧ true) 
c  in CNF:
c     b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ false 
c  in DIMACS:
 17540 -17541 -17542  0
c  -3 does not represent an automaton state.
c    -( b^{60, 10}_2 ∧  b^{60, 10}_1 ∧  b^{60, 10}_0 ∧ true) 
c  in CNF:
c    -b^{60, 10}_2 ∨ -b^{60, 10}_1 ∨ -b^{60, 10}_0 ∨ false 
c  in DIMACS:
-17540 -17541 -17542  0

c i = 11
c  -2+1 --> -1
c    ( b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧  p_660) -> ( b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0)
c  in CNF:
c    -b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨  b^{60, 12}_2
c    -b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_1
c    -b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨  b^{60, 12}_0
c  in DIMACS:
-17543 -17544  17545 -660  17546 0
-17543 -17544  17545 -660 -17547 0
-17543 -17544  17545 -660  17548 0

c  -1+1 --> 0
c    ( b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0 ∧  p_660) -> (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧ -b^{60, 12}_0)
c  in CNF:
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_2
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_1
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_0
c  in DIMACS:
-17543  17544 -17545 -660 -17546 0
-17543  17544 -17545 -660 -17547 0
-17543  17544 -17545 -660 -17548 0

c  0+1 --> 1
c    (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧  p_660) -> (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0)
c  in CNF:
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_2
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_1
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨  b^{60, 12}_0
c  in DIMACS:
 17543  17544  17545 -660 -17546 0
 17543  17544  17545 -660 -17547 0
 17543  17544  17545 -660  17548 0

c  1+1 --> 2
c    (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0 ∧  p_660) -> (-b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0)
c  in CNF:
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_2
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨  b^{60, 12}_1
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ -p_660 ∨ -b^{60, 12}_0
c  in DIMACS:
 17543  17544 -17545 -660 -17546 0
 17543  17544 -17545 -660  17547 0
 17543  17544 -17545 -660 -17548 0

c  2+1 --> break 
c    (-b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧  p_660) -> break
c  in CNF:
c     b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 17543 -17544  17545 -660 1162 0


c  2-1 --> 1
c    (-b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧ -p_660) -> (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0)
c  in CNF:
c     b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_2
c     b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_1
c     b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨  b^{60, 12}_0
c  in DIMACS:
 17543 -17544  17545  660 -17546 0
 17543 -17544  17545  660 -17547 0
 17543 -17544  17545  660  17548 0

c  1-1 --> 0
c    (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0 ∧ -p_660) -> (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧ -b^{60, 12}_0)
c  in CNF:
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_2
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_1
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_0
c  in DIMACS:
 17543  17544 -17545  660 -17546 0
 17543  17544 -17545  660 -17547 0
 17543  17544 -17545  660 -17548 0

c  0-1 --> -1
c    (-b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧ -p_660) -> ( b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0)
c  in CNF:
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨  b^{60, 12}_2
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_1
c     b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨  b^{60, 12}_0
c  in DIMACS:
 17543  17544  17545  660  17546 0
 17543  17544  17545  660 -17547 0
 17543  17544  17545  660  17548 0

c  -1-1 --> -2
c    ( b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧  b^{60, 11}_0 ∧ -p_660) -> ( b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0)
c  in CNF:
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨  b^{60, 12}_2
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨  b^{60, 12}_1
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨  p_660 ∨ -b^{60, 12}_0
c  in DIMACS:
-17543  17544 -17545  660  17546 0
-17543  17544 -17545  660  17547 0
-17543  17544 -17545  660 -17548 0

c  -2-1 --> break 
c    ( b^{60, 11}_2 ∧  b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨  b^{60, 11}_0 ∨  p_660 ∨ break
c  in DIMACS:
-17543 -17544  17545  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 11}_2 ∧ -b^{60, 11}_1 ∧ -b^{60, 11}_0 ∧ true) 
c  in CNF:
c    -b^{60, 11}_2 ∨  b^{60, 11}_1 ∨  b^{60, 11}_0 ∨ false 
c  in DIMACS:
-17543  17544  17545  0

c  3 does not represent an automaton state.
c    -(-b^{60, 11}_2 ∧  b^{60, 11}_1 ∧  b^{60, 11}_0 ∧ true) 
c  in CNF:
c     b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ false 
c  in DIMACS:
 17543 -17544 -17545  0
c  -3 does not represent an automaton state.
c    -( b^{60, 11}_2 ∧  b^{60, 11}_1 ∧  b^{60, 11}_0 ∧ true) 
c  in CNF:
c    -b^{60, 11}_2 ∨ -b^{60, 11}_1 ∨ -b^{60, 11}_0 ∨ false 
c  in DIMACS:
-17543 -17544 -17545  0

c i = 12
c  -2+1 --> -1
c    ( b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧  p_720) -> ( b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0)
c  in CNF:
c    -b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨  b^{60, 13}_2
c    -b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_1
c    -b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨  b^{60, 13}_0
c  in DIMACS:
-17546 -17547  17548 -720  17549 0
-17546 -17547  17548 -720 -17550 0
-17546 -17547  17548 -720  17551 0

c  -1+1 --> 0
c    ( b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0 ∧  p_720) -> (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧ -b^{60, 13}_0)
c  in CNF:
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_2
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_1
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_0
c  in DIMACS:
-17546  17547 -17548 -720 -17549 0
-17546  17547 -17548 -720 -17550 0
-17546  17547 -17548 -720 -17551 0

c  0+1 --> 1
c    (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧  p_720) -> (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0)
c  in CNF:
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_2
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_1
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨  b^{60, 13}_0
c  in DIMACS:
 17546  17547  17548 -720 -17549 0
 17546  17547  17548 -720 -17550 0
 17546  17547  17548 -720  17551 0

c  1+1 --> 2
c    (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0 ∧  p_720) -> (-b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0)
c  in CNF:
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_2
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨  b^{60, 13}_1
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ -p_720 ∨ -b^{60, 13}_0
c  in DIMACS:
 17546  17547 -17548 -720 -17549 0
 17546  17547 -17548 -720  17550 0
 17546  17547 -17548 -720 -17551 0

c  2+1 --> break 
c    (-b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧  p_720) -> break
c  in CNF:
c     b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 17546 -17547  17548 -720 1162 0


c  2-1 --> 1
c    (-b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧ -p_720) -> (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0)
c  in CNF:
c     b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_2
c     b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_1
c     b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨  b^{60, 13}_0
c  in DIMACS:
 17546 -17547  17548  720 -17549 0
 17546 -17547  17548  720 -17550 0
 17546 -17547  17548  720  17551 0

c  1-1 --> 0
c    (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0 ∧ -p_720) -> (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧ -b^{60, 13}_0)
c  in CNF:
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_2
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_1
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_0
c  in DIMACS:
 17546  17547 -17548  720 -17549 0
 17546  17547 -17548  720 -17550 0
 17546  17547 -17548  720 -17551 0

c  0-1 --> -1
c    (-b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧ -p_720) -> ( b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0)
c  in CNF:
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨  b^{60, 13}_2
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_1
c     b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨  b^{60, 13}_0
c  in DIMACS:
 17546  17547  17548  720  17549 0
 17546  17547  17548  720 -17550 0
 17546  17547  17548  720  17551 0

c  -1-1 --> -2
c    ( b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧  b^{60, 12}_0 ∧ -p_720) -> ( b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0)
c  in CNF:
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨  b^{60, 13}_2
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨  b^{60, 13}_1
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨  p_720 ∨ -b^{60, 13}_0
c  in DIMACS:
-17546  17547 -17548  720  17549 0
-17546  17547 -17548  720  17550 0
-17546  17547 -17548  720 -17551 0

c  -2-1 --> break 
c    ( b^{60, 12}_2 ∧  b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨  b^{60, 12}_0 ∨  p_720 ∨ break
c  in DIMACS:
-17546 -17547  17548  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 12}_2 ∧ -b^{60, 12}_1 ∧ -b^{60, 12}_0 ∧ true) 
c  in CNF:
c    -b^{60, 12}_2 ∨  b^{60, 12}_1 ∨  b^{60, 12}_0 ∨ false 
c  in DIMACS:
-17546  17547  17548  0

c  3 does not represent an automaton state.
c    -(-b^{60, 12}_2 ∧  b^{60, 12}_1 ∧  b^{60, 12}_0 ∧ true) 
c  in CNF:
c     b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ false 
c  in DIMACS:
 17546 -17547 -17548  0
c  -3 does not represent an automaton state.
c    -( b^{60, 12}_2 ∧  b^{60, 12}_1 ∧  b^{60, 12}_0 ∧ true) 
c  in CNF:
c    -b^{60, 12}_2 ∨ -b^{60, 12}_1 ∨ -b^{60, 12}_0 ∨ false 
c  in DIMACS:
-17546 -17547 -17548  0

c i = 13
c  -2+1 --> -1
c    ( b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧  p_780) -> ( b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0)
c  in CNF:
c    -b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨  b^{60, 14}_2
c    -b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_1
c    -b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨  b^{60, 14}_0
c  in DIMACS:
-17549 -17550  17551 -780  17552 0
-17549 -17550  17551 -780 -17553 0
-17549 -17550  17551 -780  17554 0

c  -1+1 --> 0
c    ( b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0 ∧  p_780) -> (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧ -b^{60, 14}_0)
c  in CNF:
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_2
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_1
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_0
c  in DIMACS:
-17549  17550 -17551 -780 -17552 0
-17549  17550 -17551 -780 -17553 0
-17549  17550 -17551 -780 -17554 0

c  0+1 --> 1
c    (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧  p_780) -> (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0)
c  in CNF:
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_2
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_1
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨  b^{60, 14}_0
c  in DIMACS:
 17549  17550  17551 -780 -17552 0
 17549  17550  17551 -780 -17553 0
 17549  17550  17551 -780  17554 0

c  1+1 --> 2
c    (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0 ∧  p_780) -> (-b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0)
c  in CNF:
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_2
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨  b^{60, 14}_1
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ -p_780 ∨ -b^{60, 14}_0
c  in DIMACS:
 17549  17550 -17551 -780 -17552 0
 17549  17550 -17551 -780  17553 0
 17549  17550 -17551 -780 -17554 0

c  2+1 --> break 
c    (-b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧  p_780) -> break
c  in CNF:
c     b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 17549 -17550  17551 -780 1162 0


c  2-1 --> 1
c    (-b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧ -p_780) -> (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0)
c  in CNF:
c     b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_2
c     b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_1
c     b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨  b^{60, 14}_0
c  in DIMACS:
 17549 -17550  17551  780 -17552 0
 17549 -17550  17551  780 -17553 0
 17549 -17550  17551  780  17554 0

c  1-1 --> 0
c    (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0 ∧ -p_780) -> (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧ -b^{60, 14}_0)
c  in CNF:
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_2
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_1
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_0
c  in DIMACS:
 17549  17550 -17551  780 -17552 0
 17549  17550 -17551  780 -17553 0
 17549  17550 -17551  780 -17554 0

c  0-1 --> -1
c    (-b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧ -p_780) -> ( b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0)
c  in CNF:
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨  b^{60, 14}_2
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_1
c     b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨  b^{60, 14}_0
c  in DIMACS:
 17549  17550  17551  780  17552 0
 17549  17550  17551  780 -17553 0
 17549  17550  17551  780  17554 0

c  -1-1 --> -2
c    ( b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧  b^{60, 13}_0 ∧ -p_780) -> ( b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0)
c  in CNF:
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨  b^{60, 14}_2
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨  b^{60, 14}_1
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨  p_780 ∨ -b^{60, 14}_0
c  in DIMACS:
-17549  17550 -17551  780  17552 0
-17549  17550 -17551  780  17553 0
-17549  17550 -17551  780 -17554 0

c  -2-1 --> break 
c    ( b^{60, 13}_2 ∧  b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨  b^{60, 13}_0 ∨  p_780 ∨ break
c  in DIMACS:
-17549 -17550  17551  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 13}_2 ∧ -b^{60, 13}_1 ∧ -b^{60, 13}_0 ∧ true) 
c  in CNF:
c    -b^{60, 13}_2 ∨  b^{60, 13}_1 ∨  b^{60, 13}_0 ∨ false 
c  in DIMACS:
-17549  17550  17551  0

c  3 does not represent an automaton state.
c    -(-b^{60, 13}_2 ∧  b^{60, 13}_1 ∧  b^{60, 13}_0 ∧ true) 
c  in CNF:
c     b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ false 
c  in DIMACS:
 17549 -17550 -17551  0
c  -3 does not represent an automaton state.
c    -( b^{60, 13}_2 ∧  b^{60, 13}_1 ∧  b^{60, 13}_0 ∧ true) 
c  in CNF:
c    -b^{60, 13}_2 ∨ -b^{60, 13}_1 ∨ -b^{60, 13}_0 ∨ false 
c  in DIMACS:
-17549 -17550 -17551  0

c i = 14
c  -2+1 --> -1
c    ( b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧  p_840) -> ( b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0)
c  in CNF:
c    -b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨  b^{60, 15}_2
c    -b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_1
c    -b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨  b^{60, 15}_0
c  in DIMACS:
-17552 -17553  17554 -840  17555 0
-17552 -17553  17554 -840 -17556 0
-17552 -17553  17554 -840  17557 0

c  -1+1 --> 0
c    ( b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0 ∧  p_840) -> (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧ -b^{60, 15}_0)
c  in CNF:
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_2
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_1
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_0
c  in DIMACS:
-17552  17553 -17554 -840 -17555 0
-17552  17553 -17554 -840 -17556 0
-17552  17553 -17554 -840 -17557 0

c  0+1 --> 1
c    (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧  p_840) -> (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0)
c  in CNF:
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_2
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_1
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨  b^{60, 15}_0
c  in DIMACS:
 17552  17553  17554 -840 -17555 0
 17552  17553  17554 -840 -17556 0
 17552  17553  17554 -840  17557 0

c  1+1 --> 2
c    (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0 ∧  p_840) -> (-b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0)
c  in CNF:
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_2
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨  b^{60, 15}_1
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ -p_840 ∨ -b^{60, 15}_0
c  in DIMACS:
 17552  17553 -17554 -840 -17555 0
 17552  17553 -17554 -840  17556 0
 17552  17553 -17554 -840 -17557 0

c  2+1 --> break 
c    (-b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧  p_840) -> break
c  in CNF:
c     b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 17552 -17553  17554 -840 1162 0


c  2-1 --> 1
c    (-b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧ -p_840) -> (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0)
c  in CNF:
c     b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_2
c     b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_1
c     b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨  b^{60, 15}_0
c  in DIMACS:
 17552 -17553  17554  840 -17555 0
 17552 -17553  17554  840 -17556 0
 17552 -17553  17554  840  17557 0

c  1-1 --> 0
c    (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0 ∧ -p_840) -> (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧ -b^{60, 15}_0)
c  in CNF:
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_2
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_1
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_0
c  in DIMACS:
 17552  17553 -17554  840 -17555 0
 17552  17553 -17554  840 -17556 0
 17552  17553 -17554  840 -17557 0

c  0-1 --> -1
c    (-b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧ -p_840) -> ( b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0)
c  in CNF:
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨  b^{60, 15}_2
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_1
c     b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨  b^{60, 15}_0
c  in DIMACS:
 17552  17553  17554  840  17555 0
 17552  17553  17554  840 -17556 0
 17552  17553  17554  840  17557 0

c  -1-1 --> -2
c    ( b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧  b^{60, 14}_0 ∧ -p_840) -> ( b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0)
c  in CNF:
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨  b^{60, 15}_2
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨  b^{60, 15}_1
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨  p_840 ∨ -b^{60, 15}_0
c  in DIMACS:
-17552  17553 -17554  840  17555 0
-17552  17553 -17554  840  17556 0
-17552  17553 -17554  840 -17557 0

c  -2-1 --> break 
c    ( b^{60, 14}_2 ∧  b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨  b^{60, 14}_0 ∨  p_840 ∨ break
c  in DIMACS:
-17552 -17553  17554  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 14}_2 ∧ -b^{60, 14}_1 ∧ -b^{60, 14}_0 ∧ true) 
c  in CNF:
c    -b^{60, 14}_2 ∨  b^{60, 14}_1 ∨  b^{60, 14}_0 ∨ false 
c  in DIMACS:
-17552  17553  17554  0

c  3 does not represent an automaton state.
c    -(-b^{60, 14}_2 ∧  b^{60, 14}_1 ∧  b^{60, 14}_0 ∧ true) 
c  in CNF:
c     b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ false 
c  in DIMACS:
 17552 -17553 -17554  0
c  -3 does not represent an automaton state.
c    -( b^{60, 14}_2 ∧  b^{60, 14}_1 ∧  b^{60, 14}_0 ∧ true) 
c  in CNF:
c    -b^{60, 14}_2 ∨ -b^{60, 14}_1 ∨ -b^{60, 14}_0 ∨ false 
c  in DIMACS:
-17552 -17553 -17554  0

c i = 15
c  -2+1 --> -1
c    ( b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧  p_900) -> ( b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0)
c  in CNF:
c    -b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨  b^{60, 16}_2
c    -b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_1
c    -b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨  b^{60, 16}_0
c  in DIMACS:
-17555 -17556  17557 -900  17558 0
-17555 -17556  17557 -900 -17559 0
-17555 -17556  17557 -900  17560 0

c  -1+1 --> 0
c    ( b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0 ∧  p_900) -> (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧ -b^{60, 16}_0)
c  in CNF:
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_2
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_1
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_0
c  in DIMACS:
-17555  17556 -17557 -900 -17558 0
-17555  17556 -17557 -900 -17559 0
-17555  17556 -17557 -900 -17560 0

c  0+1 --> 1
c    (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧  p_900) -> (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0)
c  in CNF:
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_2
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_1
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨  b^{60, 16}_0
c  in DIMACS:
 17555  17556  17557 -900 -17558 0
 17555  17556  17557 -900 -17559 0
 17555  17556  17557 -900  17560 0

c  1+1 --> 2
c    (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0 ∧  p_900) -> (-b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0)
c  in CNF:
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_2
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨  b^{60, 16}_1
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ -p_900 ∨ -b^{60, 16}_0
c  in DIMACS:
 17555  17556 -17557 -900 -17558 0
 17555  17556 -17557 -900  17559 0
 17555  17556 -17557 -900 -17560 0

c  2+1 --> break 
c    (-b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧  p_900) -> break
c  in CNF:
c     b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 17555 -17556  17557 -900 1162 0


c  2-1 --> 1
c    (-b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧ -p_900) -> (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0)
c  in CNF:
c     b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_2
c     b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_1
c     b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨  b^{60, 16}_0
c  in DIMACS:
 17555 -17556  17557  900 -17558 0
 17555 -17556  17557  900 -17559 0
 17555 -17556  17557  900  17560 0

c  1-1 --> 0
c    (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0 ∧ -p_900) -> (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧ -b^{60, 16}_0)
c  in CNF:
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_2
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_1
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_0
c  in DIMACS:
 17555  17556 -17557  900 -17558 0
 17555  17556 -17557  900 -17559 0
 17555  17556 -17557  900 -17560 0

c  0-1 --> -1
c    (-b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧ -p_900) -> ( b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0)
c  in CNF:
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨  b^{60, 16}_2
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_1
c     b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨  b^{60, 16}_0
c  in DIMACS:
 17555  17556  17557  900  17558 0
 17555  17556  17557  900 -17559 0
 17555  17556  17557  900  17560 0

c  -1-1 --> -2
c    ( b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧  b^{60, 15}_0 ∧ -p_900) -> ( b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0)
c  in CNF:
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨  b^{60, 16}_2
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨  b^{60, 16}_1
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨  p_900 ∨ -b^{60, 16}_0
c  in DIMACS:
-17555  17556 -17557  900  17558 0
-17555  17556 -17557  900  17559 0
-17555  17556 -17557  900 -17560 0

c  -2-1 --> break 
c    ( b^{60, 15}_2 ∧  b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨  b^{60, 15}_0 ∨  p_900 ∨ break
c  in DIMACS:
-17555 -17556  17557  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 15}_2 ∧ -b^{60, 15}_1 ∧ -b^{60, 15}_0 ∧ true) 
c  in CNF:
c    -b^{60, 15}_2 ∨  b^{60, 15}_1 ∨  b^{60, 15}_0 ∨ false 
c  in DIMACS:
-17555  17556  17557  0

c  3 does not represent an automaton state.
c    -(-b^{60, 15}_2 ∧  b^{60, 15}_1 ∧  b^{60, 15}_0 ∧ true) 
c  in CNF:
c     b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ false 
c  in DIMACS:
 17555 -17556 -17557  0
c  -3 does not represent an automaton state.
c    -( b^{60, 15}_2 ∧  b^{60, 15}_1 ∧  b^{60, 15}_0 ∧ true) 
c  in CNF:
c    -b^{60, 15}_2 ∨ -b^{60, 15}_1 ∨ -b^{60, 15}_0 ∨ false 
c  in DIMACS:
-17555 -17556 -17557  0

c i = 16
c  -2+1 --> -1
c    ( b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧  p_960) -> ( b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0)
c  in CNF:
c    -b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨  b^{60, 17}_2
c    -b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_1
c    -b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨  b^{60, 17}_0
c  in DIMACS:
-17558 -17559  17560 -960  17561 0
-17558 -17559  17560 -960 -17562 0
-17558 -17559  17560 -960  17563 0

c  -1+1 --> 0
c    ( b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0 ∧  p_960) -> (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧ -b^{60, 17}_0)
c  in CNF:
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_2
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_1
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_0
c  in DIMACS:
-17558  17559 -17560 -960 -17561 0
-17558  17559 -17560 -960 -17562 0
-17558  17559 -17560 -960 -17563 0

c  0+1 --> 1
c    (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧  p_960) -> (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0)
c  in CNF:
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_2
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_1
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨  b^{60, 17}_0
c  in DIMACS:
 17558  17559  17560 -960 -17561 0
 17558  17559  17560 -960 -17562 0
 17558  17559  17560 -960  17563 0

c  1+1 --> 2
c    (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0 ∧  p_960) -> (-b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0)
c  in CNF:
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_2
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨  b^{60, 17}_1
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ -p_960 ∨ -b^{60, 17}_0
c  in DIMACS:
 17558  17559 -17560 -960 -17561 0
 17558  17559 -17560 -960  17562 0
 17558  17559 -17560 -960 -17563 0

c  2+1 --> break 
c    (-b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧  p_960) -> break
c  in CNF:
c     b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 17558 -17559  17560 -960 1162 0


c  2-1 --> 1
c    (-b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧ -p_960) -> (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0)
c  in CNF:
c     b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_2
c     b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_1
c     b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨  b^{60, 17}_0
c  in DIMACS:
 17558 -17559  17560  960 -17561 0
 17558 -17559  17560  960 -17562 0
 17558 -17559  17560  960  17563 0

c  1-1 --> 0
c    (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0 ∧ -p_960) -> (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧ -b^{60, 17}_0)
c  in CNF:
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_2
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_1
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_0
c  in DIMACS:
 17558  17559 -17560  960 -17561 0
 17558  17559 -17560  960 -17562 0
 17558  17559 -17560  960 -17563 0

c  0-1 --> -1
c    (-b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧ -p_960) -> ( b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0)
c  in CNF:
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨  b^{60, 17}_2
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_1
c     b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨  b^{60, 17}_0
c  in DIMACS:
 17558  17559  17560  960  17561 0
 17558  17559  17560  960 -17562 0
 17558  17559  17560  960  17563 0

c  -1-1 --> -2
c    ( b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧  b^{60, 16}_0 ∧ -p_960) -> ( b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0)
c  in CNF:
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨  b^{60, 17}_2
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨  b^{60, 17}_1
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨  p_960 ∨ -b^{60, 17}_0
c  in DIMACS:
-17558  17559 -17560  960  17561 0
-17558  17559 -17560  960  17562 0
-17558  17559 -17560  960 -17563 0

c  -2-1 --> break 
c    ( b^{60, 16}_2 ∧  b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨  b^{60, 16}_0 ∨  p_960 ∨ break
c  in DIMACS:
-17558 -17559  17560  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 16}_2 ∧ -b^{60, 16}_1 ∧ -b^{60, 16}_0 ∧ true) 
c  in CNF:
c    -b^{60, 16}_2 ∨  b^{60, 16}_1 ∨  b^{60, 16}_0 ∨ false 
c  in DIMACS:
-17558  17559  17560  0

c  3 does not represent an automaton state.
c    -(-b^{60, 16}_2 ∧  b^{60, 16}_1 ∧  b^{60, 16}_0 ∧ true) 
c  in CNF:
c     b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ false 
c  in DIMACS:
 17558 -17559 -17560  0
c  -3 does not represent an automaton state.
c    -( b^{60, 16}_2 ∧  b^{60, 16}_1 ∧  b^{60, 16}_0 ∧ true) 
c  in CNF:
c    -b^{60, 16}_2 ∨ -b^{60, 16}_1 ∨ -b^{60, 16}_0 ∨ false 
c  in DIMACS:
-17558 -17559 -17560  0

c i = 17
c  -2+1 --> -1
c    ( b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧  p_1020) -> ( b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0)
c  in CNF:
c    -b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨  b^{60, 18}_2
c    -b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_1
c    -b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨  b^{60, 18}_0
c  in DIMACS:
-17561 -17562  17563 -1020  17564 0
-17561 -17562  17563 -1020 -17565 0
-17561 -17562  17563 -1020  17566 0

c  -1+1 --> 0
c    ( b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0 ∧  p_1020) -> (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧ -b^{60, 18}_0)
c  in CNF:
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_2
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_1
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_0
c  in DIMACS:
-17561  17562 -17563 -1020 -17564 0
-17561  17562 -17563 -1020 -17565 0
-17561  17562 -17563 -1020 -17566 0

c  0+1 --> 1
c    (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧  p_1020) -> (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0)
c  in CNF:
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_2
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_1
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨  b^{60, 18}_0
c  in DIMACS:
 17561  17562  17563 -1020 -17564 0
 17561  17562  17563 -1020 -17565 0
 17561  17562  17563 -1020  17566 0

c  1+1 --> 2
c    (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0 ∧  p_1020) -> (-b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0)
c  in CNF:
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_2
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨  b^{60, 18}_1
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ -p_1020 ∨ -b^{60, 18}_0
c  in DIMACS:
 17561  17562 -17563 -1020 -17564 0
 17561  17562 -17563 -1020  17565 0
 17561  17562 -17563 -1020 -17566 0

c  2+1 --> break 
c    (-b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 17561 -17562  17563 -1020 1162 0


c  2-1 --> 1
c    (-b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧ -p_1020) -> (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0)
c  in CNF:
c     b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_2
c     b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_1
c     b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨  b^{60, 18}_0
c  in DIMACS:
 17561 -17562  17563  1020 -17564 0
 17561 -17562  17563  1020 -17565 0
 17561 -17562  17563  1020  17566 0

c  1-1 --> 0
c    (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0 ∧ -p_1020) -> (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧ -b^{60, 18}_0)
c  in CNF:
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_2
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_1
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_0
c  in DIMACS:
 17561  17562 -17563  1020 -17564 0
 17561  17562 -17563  1020 -17565 0
 17561  17562 -17563  1020 -17566 0

c  0-1 --> -1
c    (-b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧ -p_1020) -> ( b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0)
c  in CNF:
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨  b^{60, 18}_2
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_1
c     b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨  b^{60, 18}_0
c  in DIMACS:
 17561  17562  17563  1020  17564 0
 17561  17562  17563  1020 -17565 0
 17561  17562  17563  1020  17566 0

c  -1-1 --> -2
c    ( b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧  b^{60, 17}_0 ∧ -p_1020) -> ( b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0)
c  in CNF:
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨  b^{60, 18}_2
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨  b^{60, 18}_1
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨  p_1020 ∨ -b^{60, 18}_0
c  in DIMACS:
-17561  17562 -17563  1020  17564 0
-17561  17562 -17563  1020  17565 0
-17561  17562 -17563  1020 -17566 0

c  -2-1 --> break 
c    ( b^{60, 17}_2 ∧  b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨  b^{60, 17}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-17561 -17562  17563  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 17}_2 ∧ -b^{60, 17}_1 ∧ -b^{60, 17}_0 ∧ true) 
c  in CNF:
c    -b^{60, 17}_2 ∨  b^{60, 17}_1 ∨  b^{60, 17}_0 ∨ false 
c  in DIMACS:
-17561  17562  17563  0

c  3 does not represent an automaton state.
c    -(-b^{60, 17}_2 ∧  b^{60, 17}_1 ∧  b^{60, 17}_0 ∧ true) 
c  in CNF:
c     b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ false 
c  in DIMACS:
 17561 -17562 -17563  0
c  -3 does not represent an automaton state.
c    -( b^{60, 17}_2 ∧  b^{60, 17}_1 ∧  b^{60, 17}_0 ∧ true) 
c  in CNF:
c    -b^{60, 17}_2 ∨ -b^{60, 17}_1 ∨ -b^{60, 17}_0 ∨ false 
c  in DIMACS:
-17561 -17562 -17563  0

c i = 18
c  -2+1 --> -1
c    ( b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧  p_1080) -> ( b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0)
c  in CNF:
c    -b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨  b^{60, 19}_2
c    -b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_1
c    -b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨  b^{60, 19}_0
c  in DIMACS:
-17564 -17565  17566 -1080  17567 0
-17564 -17565  17566 -1080 -17568 0
-17564 -17565  17566 -1080  17569 0

c  -1+1 --> 0
c    ( b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0 ∧  p_1080) -> (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧ -b^{60, 19}_0)
c  in CNF:
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_2
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_1
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_0
c  in DIMACS:
-17564  17565 -17566 -1080 -17567 0
-17564  17565 -17566 -1080 -17568 0
-17564  17565 -17566 -1080 -17569 0

c  0+1 --> 1
c    (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧  p_1080) -> (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0)
c  in CNF:
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_2
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_1
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨  b^{60, 19}_0
c  in DIMACS:
 17564  17565  17566 -1080 -17567 0
 17564  17565  17566 -1080 -17568 0
 17564  17565  17566 -1080  17569 0

c  1+1 --> 2
c    (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0 ∧  p_1080) -> (-b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0)
c  in CNF:
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_2
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨  b^{60, 19}_1
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ -p_1080 ∨ -b^{60, 19}_0
c  in DIMACS:
 17564  17565 -17566 -1080 -17567 0
 17564  17565 -17566 -1080  17568 0
 17564  17565 -17566 -1080 -17569 0

c  2+1 --> break 
c    (-b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 17564 -17565  17566 -1080 1162 0


c  2-1 --> 1
c    (-b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧ -p_1080) -> (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0)
c  in CNF:
c     b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_2
c     b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_1
c     b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨  b^{60, 19}_0
c  in DIMACS:
 17564 -17565  17566  1080 -17567 0
 17564 -17565  17566  1080 -17568 0
 17564 -17565  17566  1080  17569 0

c  1-1 --> 0
c    (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0 ∧ -p_1080) -> (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧ -b^{60, 19}_0)
c  in CNF:
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_2
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_1
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_0
c  in DIMACS:
 17564  17565 -17566  1080 -17567 0
 17564  17565 -17566  1080 -17568 0
 17564  17565 -17566  1080 -17569 0

c  0-1 --> -1
c    (-b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧ -p_1080) -> ( b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0)
c  in CNF:
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨  b^{60, 19}_2
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_1
c     b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨  b^{60, 19}_0
c  in DIMACS:
 17564  17565  17566  1080  17567 0
 17564  17565  17566  1080 -17568 0
 17564  17565  17566  1080  17569 0

c  -1-1 --> -2
c    ( b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧  b^{60, 18}_0 ∧ -p_1080) -> ( b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0)
c  in CNF:
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨  b^{60, 19}_2
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨  b^{60, 19}_1
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨  p_1080 ∨ -b^{60, 19}_0
c  in DIMACS:
-17564  17565 -17566  1080  17567 0
-17564  17565 -17566  1080  17568 0
-17564  17565 -17566  1080 -17569 0

c  -2-1 --> break 
c    ( b^{60, 18}_2 ∧  b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨  b^{60, 18}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-17564 -17565  17566  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 18}_2 ∧ -b^{60, 18}_1 ∧ -b^{60, 18}_0 ∧ true) 
c  in CNF:
c    -b^{60, 18}_2 ∨  b^{60, 18}_1 ∨  b^{60, 18}_0 ∨ false 
c  in DIMACS:
-17564  17565  17566  0

c  3 does not represent an automaton state.
c    -(-b^{60, 18}_2 ∧  b^{60, 18}_1 ∧  b^{60, 18}_0 ∧ true) 
c  in CNF:
c     b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ false 
c  in DIMACS:
 17564 -17565 -17566  0
c  -3 does not represent an automaton state.
c    -( b^{60, 18}_2 ∧  b^{60, 18}_1 ∧  b^{60, 18}_0 ∧ true) 
c  in CNF:
c    -b^{60, 18}_2 ∨ -b^{60, 18}_1 ∨ -b^{60, 18}_0 ∨ false 
c  in DIMACS:
-17564 -17565 -17566  0

c i = 19
c  -2+1 --> -1
c    ( b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧  p_1140) -> ( b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧  b^{60, 20}_0)
c  in CNF:
c    -b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨  b^{60, 20}_2
c    -b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_1
c    -b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨  b^{60, 20}_0
c  in DIMACS:
-17567 -17568  17569 -1140  17570 0
-17567 -17568  17569 -1140 -17571 0
-17567 -17568  17569 -1140  17572 0

c  -1+1 --> 0
c    ( b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0 ∧  p_1140) -> (-b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧ -b^{60, 20}_0)
c  in CNF:
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_2
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_1
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_0
c  in DIMACS:
-17567  17568 -17569 -1140 -17570 0
-17567  17568 -17569 -1140 -17571 0
-17567  17568 -17569 -1140 -17572 0

c  0+1 --> 1
c    (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧  p_1140) -> (-b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧  b^{60, 20}_0)
c  in CNF:
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_2
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_1
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨  b^{60, 20}_0
c  in DIMACS:
 17567  17568  17569 -1140 -17570 0
 17567  17568  17569 -1140 -17571 0
 17567  17568  17569 -1140  17572 0

c  1+1 --> 2
c    (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0 ∧  p_1140) -> (-b^{60, 20}_2 ∧  b^{60, 20}_1 ∧ -b^{60, 20}_0)
c  in CNF:
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_2
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨  b^{60, 20}_1
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ -p_1140 ∨ -b^{60, 20}_0
c  in DIMACS:
 17567  17568 -17569 -1140 -17570 0
 17567  17568 -17569 -1140  17571 0
 17567  17568 -17569 -1140 -17572 0

c  2+1 --> break 
c    (-b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 17567 -17568  17569 -1140 1162 0


c  2-1 --> 1
c    (-b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧ -p_1140) -> (-b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧  b^{60, 20}_0)
c  in CNF:
c     b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_2
c     b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_1
c     b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨  b^{60, 20}_0
c  in DIMACS:
 17567 -17568  17569  1140 -17570 0
 17567 -17568  17569  1140 -17571 0
 17567 -17568  17569  1140  17572 0

c  1-1 --> 0
c    (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0 ∧ -p_1140) -> (-b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧ -b^{60, 20}_0)
c  in CNF:
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_2
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_1
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_0
c  in DIMACS:
 17567  17568 -17569  1140 -17570 0
 17567  17568 -17569  1140 -17571 0
 17567  17568 -17569  1140 -17572 0

c  0-1 --> -1
c    (-b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧ -p_1140) -> ( b^{60, 20}_2 ∧ -b^{60, 20}_1 ∧  b^{60, 20}_0)
c  in CNF:
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨  b^{60, 20}_2
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_1
c     b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨  b^{60, 20}_0
c  in DIMACS:
 17567  17568  17569  1140  17570 0
 17567  17568  17569  1140 -17571 0
 17567  17568  17569  1140  17572 0

c  -1-1 --> -2
c    ( b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧  b^{60, 19}_0 ∧ -p_1140) -> ( b^{60, 20}_2 ∧  b^{60, 20}_1 ∧ -b^{60, 20}_0)
c  in CNF:
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨  b^{60, 20}_2
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨  b^{60, 20}_1
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨  p_1140 ∨ -b^{60, 20}_0
c  in DIMACS:
-17567  17568 -17569  1140  17570 0
-17567  17568 -17569  1140  17571 0
-17567  17568 -17569  1140 -17572 0

c  -2-1 --> break 
c    ( b^{60, 19}_2 ∧  b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨  b^{60, 19}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-17567 -17568  17569  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{60, 19}_2 ∧ -b^{60, 19}_1 ∧ -b^{60, 19}_0 ∧ true) 
c  in CNF:
c    -b^{60, 19}_2 ∨  b^{60, 19}_1 ∨  b^{60, 19}_0 ∨ false 
c  in DIMACS:
-17567  17568  17569  0

c  3 does not represent an automaton state.
c    -(-b^{60, 19}_2 ∧  b^{60, 19}_1 ∧  b^{60, 19}_0 ∧ true) 
c  in CNF:
c     b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ false 
c  in DIMACS:
 17567 -17568 -17569  0
c  -3 does not represent an automaton state.
c    -( b^{60, 19}_2 ∧  b^{60, 19}_1 ∧  b^{60, 19}_0 ∧ true) 
c  in CNF:
c    -b^{60, 19}_2 ∨ -b^{60, 19}_1 ∨ -b^{60, 19}_0 ∨ false 
c  in DIMACS:
-17567 -17568 -17569  0

c INIT for k = 61
c    -b^{61, 1}_2
c    -b^{61, 1}_1
c    -b^{61, 1}_0
c  in DIMACS:
-17573 0
-17574 0
-17575 0

c Transitions for k = 61
c i = 1
c  -2+1 --> -1
c    ( b^{61, 1}_2 ∧  b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧  p_61) -> ( b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0)
c  in CNF:
c    -b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨  b^{61, 2}_2
c    -b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_1
c    -b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨  b^{61, 2}_0
c  in DIMACS:
-17573 -17574  17575 -61  17576 0
-17573 -17574  17575 -61 -17577 0
-17573 -17574  17575 -61  17578 0

c  -1+1 --> 0
c    ( b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧  b^{61, 1}_0 ∧  p_61) -> (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧ -b^{61, 2}_0)
c  in CNF:
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_2
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_1
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_0
c  in DIMACS:
-17573  17574 -17575 -61 -17576 0
-17573  17574 -17575 -61 -17577 0
-17573  17574 -17575 -61 -17578 0

c  0+1 --> 1
c    (-b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧  p_61) -> (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0)
c  in CNF:
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_2
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_1
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨  b^{61, 2}_0
c  in DIMACS:
 17573  17574  17575 -61 -17576 0
 17573  17574  17575 -61 -17577 0
 17573  17574  17575 -61  17578 0

c  1+1 --> 2
c    (-b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧  b^{61, 1}_0 ∧  p_61) -> (-b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0)
c  in CNF:
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_2
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨  b^{61, 2}_1
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ -p_61 ∨ -b^{61, 2}_0
c  in DIMACS:
 17573  17574 -17575 -61 -17576 0
 17573  17574 -17575 -61  17577 0
 17573  17574 -17575 -61 -17578 0

c  2+1 --> break 
c    (-b^{61, 1}_2 ∧  b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧  p_61) -> break
c  in CNF:
c     b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ -p_61 ∨ break
c  in DIMACS:
 17573 -17574  17575 -61 1162 0


c  2-1 --> 1
c    (-b^{61, 1}_2 ∧  b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧ -p_61) -> (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0)
c  in CNF:
c     b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_2
c     b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_1
c     b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨  b^{61, 2}_0
c  in DIMACS:
 17573 -17574  17575  61 -17576 0
 17573 -17574  17575  61 -17577 0
 17573 -17574  17575  61  17578 0

c  1-1 --> 0
c    (-b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧  b^{61, 1}_0 ∧ -p_61) -> (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧ -b^{61, 2}_0)
c  in CNF:
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_2
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_1
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_0
c  in DIMACS:
 17573  17574 -17575  61 -17576 0
 17573  17574 -17575  61 -17577 0
 17573  17574 -17575  61 -17578 0

c  0-1 --> -1
c    (-b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧ -p_61) -> ( b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0)
c  in CNF:
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨  b^{61, 2}_2
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_1
c     b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨  b^{61, 2}_0
c  in DIMACS:
 17573  17574  17575  61  17576 0
 17573  17574  17575  61 -17577 0
 17573  17574  17575  61  17578 0

c  -1-1 --> -2
c    ( b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧  b^{61, 1}_0 ∧ -p_61) -> ( b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0)
c  in CNF:
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨  b^{61, 2}_2
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨  b^{61, 2}_1
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨  p_61 ∨ -b^{61, 2}_0
c  in DIMACS:
-17573  17574 -17575  61  17576 0
-17573  17574 -17575  61  17577 0
-17573  17574 -17575  61 -17578 0

c  -2-1 --> break 
c    ( b^{61, 1}_2 ∧  b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧ -p_61) -> break
c  in CNF:
c    -b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨  b^{61, 1}_0 ∨  p_61 ∨ break
c  in DIMACS:
-17573 -17574  17575  61 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 1}_2 ∧ -b^{61, 1}_1 ∧ -b^{61, 1}_0 ∧ true) 
c  in CNF:
c    -b^{61, 1}_2 ∨  b^{61, 1}_1 ∨  b^{61, 1}_0 ∨ false 
c  in DIMACS:
-17573  17574  17575  0

c  3 does not represent an automaton state.
c    -(-b^{61, 1}_2 ∧  b^{61, 1}_1 ∧  b^{61, 1}_0 ∧ true) 
c  in CNF:
c     b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ false 
c  in DIMACS:
 17573 -17574 -17575  0
c  -3 does not represent an automaton state.
c    -( b^{61, 1}_2 ∧  b^{61, 1}_1 ∧  b^{61, 1}_0 ∧ true) 
c  in CNF:
c    -b^{61, 1}_2 ∨ -b^{61, 1}_1 ∨ -b^{61, 1}_0 ∨ false 
c  in DIMACS:
-17573 -17574 -17575  0

c i = 2
c  -2+1 --> -1
c    ( b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧  p_122) -> ( b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0)
c  in CNF:
c    -b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨  b^{61, 3}_2
c    -b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_1
c    -b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨  b^{61, 3}_0
c  in DIMACS:
-17576 -17577  17578 -122  17579 0
-17576 -17577  17578 -122 -17580 0
-17576 -17577  17578 -122  17581 0

c  -1+1 --> 0
c    ( b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0 ∧  p_122) -> (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧ -b^{61, 3}_0)
c  in CNF:
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_2
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_1
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_0
c  in DIMACS:
-17576  17577 -17578 -122 -17579 0
-17576  17577 -17578 -122 -17580 0
-17576  17577 -17578 -122 -17581 0

c  0+1 --> 1
c    (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧  p_122) -> (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0)
c  in CNF:
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_2
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_1
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨  b^{61, 3}_0
c  in DIMACS:
 17576  17577  17578 -122 -17579 0
 17576  17577  17578 -122 -17580 0
 17576  17577  17578 -122  17581 0

c  1+1 --> 2
c    (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0 ∧  p_122) -> (-b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0)
c  in CNF:
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_2
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨  b^{61, 3}_1
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ -p_122 ∨ -b^{61, 3}_0
c  in DIMACS:
 17576  17577 -17578 -122 -17579 0
 17576  17577 -17578 -122  17580 0
 17576  17577 -17578 -122 -17581 0

c  2+1 --> break 
c    (-b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧  p_122) -> break
c  in CNF:
c     b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ -p_122 ∨ break
c  in DIMACS:
 17576 -17577  17578 -122 1162 0


c  2-1 --> 1
c    (-b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧ -p_122) -> (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0)
c  in CNF:
c     b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_2
c     b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_1
c     b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨  b^{61, 3}_0
c  in DIMACS:
 17576 -17577  17578  122 -17579 0
 17576 -17577  17578  122 -17580 0
 17576 -17577  17578  122  17581 0

c  1-1 --> 0
c    (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0 ∧ -p_122) -> (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧ -b^{61, 3}_0)
c  in CNF:
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_2
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_1
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_0
c  in DIMACS:
 17576  17577 -17578  122 -17579 0
 17576  17577 -17578  122 -17580 0
 17576  17577 -17578  122 -17581 0

c  0-1 --> -1
c    (-b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧ -p_122) -> ( b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0)
c  in CNF:
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨  b^{61, 3}_2
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_1
c     b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨  b^{61, 3}_0
c  in DIMACS:
 17576  17577  17578  122  17579 0
 17576  17577  17578  122 -17580 0
 17576  17577  17578  122  17581 0

c  -1-1 --> -2
c    ( b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧  b^{61, 2}_0 ∧ -p_122) -> ( b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0)
c  in CNF:
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨  b^{61, 3}_2
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨  b^{61, 3}_1
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨  p_122 ∨ -b^{61, 3}_0
c  in DIMACS:
-17576  17577 -17578  122  17579 0
-17576  17577 -17578  122  17580 0
-17576  17577 -17578  122 -17581 0

c  -2-1 --> break 
c    ( b^{61, 2}_2 ∧  b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧ -p_122) -> break
c  in CNF:
c    -b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨  b^{61, 2}_0 ∨  p_122 ∨ break
c  in DIMACS:
-17576 -17577  17578  122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 2}_2 ∧ -b^{61, 2}_1 ∧ -b^{61, 2}_0 ∧ true) 
c  in CNF:
c    -b^{61, 2}_2 ∨  b^{61, 2}_1 ∨  b^{61, 2}_0 ∨ false 
c  in DIMACS:
-17576  17577  17578  0

c  3 does not represent an automaton state.
c    -(-b^{61, 2}_2 ∧  b^{61, 2}_1 ∧  b^{61, 2}_0 ∧ true) 
c  in CNF:
c     b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ false 
c  in DIMACS:
 17576 -17577 -17578  0
c  -3 does not represent an automaton state.
c    -( b^{61, 2}_2 ∧  b^{61, 2}_1 ∧  b^{61, 2}_0 ∧ true) 
c  in CNF:
c    -b^{61, 2}_2 ∨ -b^{61, 2}_1 ∨ -b^{61, 2}_0 ∨ false 
c  in DIMACS:
-17576 -17577 -17578  0

c i = 3
c  -2+1 --> -1
c    ( b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧  p_183) -> ( b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0)
c  in CNF:
c    -b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨  b^{61, 4}_2
c    -b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_1
c    -b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨  b^{61, 4}_0
c  in DIMACS:
-17579 -17580  17581 -183  17582 0
-17579 -17580  17581 -183 -17583 0
-17579 -17580  17581 -183  17584 0

c  -1+1 --> 0
c    ( b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0 ∧  p_183) -> (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧ -b^{61, 4}_0)
c  in CNF:
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_2
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_1
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_0
c  in DIMACS:
-17579  17580 -17581 -183 -17582 0
-17579  17580 -17581 -183 -17583 0
-17579  17580 -17581 -183 -17584 0

c  0+1 --> 1
c    (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧  p_183) -> (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0)
c  in CNF:
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_2
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_1
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨  b^{61, 4}_0
c  in DIMACS:
 17579  17580  17581 -183 -17582 0
 17579  17580  17581 -183 -17583 0
 17579  17580  17581 -183  17584 0

c  1+1 --> 2
c    (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0 ∧  p_183) -> (-b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0)
c  in CNF:
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_2
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨  b^{61, 4}_1
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ -p_183 ∨ -b^{61, 4}_0
c  in DIMACS:
 17579  17580 -17581 -183 -17582 0
 17579  17580 -17581 -183  17583 0
 17579  17580 -17581 -183 -17584 0

c  2+1 --> break 
c    (-b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧  p_183) -> break
c  in CNF:
c     b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ -p_183 ∨ break
c  in DIMACS:
 17579 -17580  17581 -183 1162 0


c  2-1 --> 1
c    (-b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧ -p_183) -> (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0)
c  in CNF:
c     b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_2
c     b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_1
c     b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨  b^{61, 4}_0
c  in DIMACS:
 17579 -17580  17581  183 -17582 0
 17579 -17580  17581  183 -17583 0
 17579 -17580  17581  183  17584 0

c  1-1 --> 0
c    (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0 ∧ -p_183) -> (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧ -b^{61, 4}_0)
c  in CNF:
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_2
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_1
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_0
c  in DIMACS:
 17579  17580 -17581  183 -17582 0
 17579  17580 -17581  183 -17583 0
 17579  17580 -17581  183 -17584 0

c  0-1 --> -1
c    (-b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧ -p_183) -> ( b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0)
c  in CNF:
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨  b^{61, 4}_2
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_1
c     b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨  b^{61, 4}_0
c  in DIMACS:
 17579  17580  17581  183  17582 0
 17579  17580  17581  183 -17583 0
 17579  17580  17581  183  17584 0

c  -1-1 --> -2
c    ( b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧  b^{61, 3}_0 ∧ -p_183) -> ( b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0)
c  in CNF:
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨  b^{61, 4}_2
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨  b^{61, 4}_1
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨  p_183 ∨ -b^{61, 4}_0
c  in DIMACS:
-17579  17580 -17581  183  17582 0
-17579  17580 -17581  183  17583 0
-17579  17580 -17581  183 -17584 0

c  -2-1 --> break 
c    ( b^{61, 3}_2 ∧  b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧ -p_183) -> break
c  in CNF:
c    -b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨  b^{61, 3}_0 ∨  p_183 ∨ break
c  in DIMACS:
-17579 -17580  17581  183 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 3}_2 ∧ -b^{61, 3}_1 ∧ -b^{61, 3}_0 ∧ true) 
c  in CNF:
c    -b^{61, 3}_2 ∨  b^{61, 3}_1 ∨  b^{61, 3}_0 ∨ false 
c  in DIMACS:
-17579  17580  17581  0

c  3 does not represent an automaton state.
c    -(-b^{61, 3}_2 ∧  b^{61, 3}_1 ∧  b^{61, 3}_0 ∧ true) 
c  in CNF:
c     b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ false 
c  in DIMACS:
 17579 -17580 -17581  0
c  -3 does not represent an automaton state.
c    -( b^{61, 3}_2 ∧  b^{61, 3}_1 ∧  b^{61, 3}_0 ∧ true) 
c  in CNF:
c    -b^{61, 3}_2 ∨ -b^{61, 3}_1 ∨ -b^{61, 3}_0 ∨ false 
c  in DIMACS:
-17579 -17580 -17581  0

c i = 4
c  -2+1 --> -1
c    ( b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧  p_244) -> ( b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0)
c  in CNF:
c    -b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨  b^{61, 5}_2
c    -b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_1
c    -b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨  b^{61, 5}_0
c  in DIMACS:
-17582 -17583  17584 -244  17585 0
-17582 -17583  17584 -244 -17586 0
-17582 -17583  17584 -244  17587 0

c  -1+1 --> 0
c    ( b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0 ∧  p_244) -> (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧ -b^{61, 5}_0)
c  in CNF:
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_2
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_1
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_0
c  in DIMACS:
-17582  17583 -17584 -244 -17585 0
-17582  17583 -17584 -244 -17586 0
-17582  17583 -17584 -244 -17587 0

c  0+1 --> 1
c    (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧  p_244) -> (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0)
c  in CNF:
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_2
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_1
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨  b^{61, 5}_0
c  in DIMACS:
 17582  17583  17584 -244 -17585 0
 17582  17583  17584 -244 -17586 0
 17582  17583  17584 -244  17587 0

c  1+1 --> 2
c    (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0 ∧  p_244) -> (-b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0)
c  in CNF:
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_2
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨  b^{61, 5}_1
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ -p_244 ∨ -b^{61, 5}_0
c  in DIMACS:
 17582  17583 -17584 -244 -17585 0
 17582  17583 -17584 -244  17586 0
 17582  17583 -17584 -244 -17587 0

c  2+1 --> break 
c    (-b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧  p_244) -> break
c  in CNF:
c     b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 17582 -17583  17584 -244 1162 0


c  2-1 --> 1
c    (-b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧ -p_244) -> (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0)
c  in CNF:
c     b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_2
c     b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_1
c     b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨  b^{61, 5}_0
c  in DIMACS:
 17582 -17583  17584  244 -17585 0
 17582 -17583  17584  244 -17586 0
 17582 -17583  17584  244  17587 0

c  1-1 --> 0
c    (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0 ∧ -p_244) -> (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧ -b^{61, 5}_0)
c  in CNF:
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_2
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_1
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_0
c  in DIMACS:
 17582  17583 -17584  244 -17585 0
 17582  17583 -17584  244 -17586 0
 17582  17583 -17584  244 -17587 0

c  0-1 --> -1
c    (-b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧ -p_244) -> ( b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0)
c  in CNF:
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨  b^{61, 5}_2
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_1
c     b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨  b^{61, 5}_0
c  in DIMACS:
 17582  17583  17584  244  17585 0
 17582  17583  17584  244 -17586 0
 17582  17583  17584  244  17587 0

c  -1-1 --> -2
c    ( b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧  b^{61, 4}_0 ∧ -p_244) -> ( b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0)
c  in CNF:
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨  b^{61, 5}_2
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨  b^{61, 5}_1
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨  p_244 ∨ -b^{61, 5}_0
c  in DIMACS:
-17582  17583 -17584  244  17585 0
-17582  17583 -17584  244  17586 0
-17582  17583 -17584  244 -17587 0

c  -2-1 --> break 
c    ( b^{61, 4}_2 ∧  b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨  b^{61, 4}_0 ∨  p_244 ∨ break
c  in DIMACS:
-17582 -17583  17584  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 4}_2 ∧ -b^{61, 4}_1 ∧ -b^{61, 4}_0 ∧ true) 
c  in CNF:
c    -b^{61, 4}_2 ∨  b^{61, 4}_1 ∨  b^{61, 4}_0 ∨ false 
c  in DIMACS:
-17582  17583  17584  0

c  3 does not represent an automaton state.
c    -(-b^{61, 4}_2 ∧  b^{61, 4}_1 ∧  b^{61, 4}_0 ∧ true) 
c  in CNF:
c     b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ false 
c  in DIMACS:
 17582 -17583 -17584  0
c  -3 does not represent an automaton state.
c    -( b^{61, 4}_2 ∧  b^{61, 4}_1 ∧  b^{61, 4}_0 ∧ true) 
c  in CNF:
c    -b^{61, 4}_2 ∨ -b^{61, 4}_1 ∨ -b^{61, 4}_0 ∨ false 
c  in DIMACS:
-17582 -17583 -17584  0

c i = 5
c  -2+1 --> -1
c    ( b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧  p_305) -> ( b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0)
c  in CNF:
c    -b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨  b^{61, 6}_2
c    -b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_1
c    -b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨  b^{61, 6}_0
c  in DIMACS:
-17585 -17586  17587 -305  17588 0
-17585 -17586  17587 -305 -17589 0
-17585 -17586  17587 -305  17590 0

c  -1+1 --> 0
c    ( b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0 ∧  p_305) -> (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧ -b^{61, 6}_0)
c  in CNF:
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_2
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_1
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_0
c  in DIMACS:
-17585  17586 -17587 -305 -17588 0
-17585  17586 -17587 -305 -17589 0
-17585  17586 -17587 -305 -17590 0

c  0+1 --> 1
c    (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧  p_305) -> (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0)
c  in CNF:
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_2
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_1
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨  b^{61, 6}_0
c  in DIMACS:
 17585  17586  17587 -305 -17588 0
 17585  17586  17587 -305 -17589 0
 17585  17586  17587 -305  17590 0

c  1+1 --> 2
c    (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0 ∧  p_305) -> (-b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0)
c  in CNF:
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_2
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨  b^{61, 6}_1
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ -p_305 ∨ -b^{61, 6}_0
c  in DIMACS:
 17585  17586 -17587 -305 -17588 0
 17585  17586 -17587 -305  17589 0
 17585  17586 -17587 -305 -17590 0

c  2+1 --> break 
c    (-b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧  p_305) -> break
c  in CNF:
c     b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ -p_305 ∨ break
c  in DIMACS:
 17585 -17586  17587 -305 1162 0


c  2-1 --> 1
c    (-b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧ -p_305) -> (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0)
c  in CNF:
c     b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_2
c     b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_1
c     b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨  b^{61, 6}_0
c  in DIMACS:
 17585 -17586  17587  305 -17588 0
 17585 -17586  17587  305 -17589 0
 17585 -17586  17587  305  17590 0

c  1-1 --> 0
c    (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0 ∧ -p_305) -> (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧ -b^{61, 6}_0)
c  in CNF:
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_2
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_1
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_0
c  in DIMACS:
 17585  17586 -17587  305 -17588 0
 17585  17586 -17587  305 -17589 0
 17585  17586 -17587  305 -17590 0

c  0-1 --> -1
c    (-b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧ -p_305) -> ( b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0)
c  in CNF:
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨  b^{61, 6}_2
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_1
c     b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨  b^{61, 6}_0
c  in DIMACS:
 17585  17586  17587  305  17588 0
 17585  17586  17587  305 -17589 0
 17585  17586  17587  305  17590 0

c  -1-1 --> -2
c    ( b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧  b^{61, 5}_0 ∧ -p_305) -> ( b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0)
c  in CNF:
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨  b^{61, 6}_2
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨  b^{61, 6}_1
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨  p_305 ∨ -b^{61, 6}_0
c  in DIMACS:
-17585  17586 -17587  305  17588 0
-17585  17586 -17587  305  17589 0
-17585  17586 -17587  305 -17590 0

c  -2-1 --> break 
c    ( b^{61, 5}_2 ∧  b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧ -p_305) -> break
c  in CNF:
c    -b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨  b^{61, 5}_0 ∨  p_305 ∨ break
c  in DIMACS:
-17585 -17586  17587  305 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 5}_2 ∧ -b^{61, 5}_1 ∧ -b^{61, 5}_0 ∧ true) 
c  in CNF:
c    -b^{61, 5}_2 ∨  b^{61, 5}_1 ∨  b^{61, 5}_0 ∨ false 
c  in DIMACS:
-17585  17586  17587  0

c  3 does not represent an automaton state.
c    -(-b^{61, 5}_2 ∧  b^{61, 5}_1 ∧  b^{61, 5}_0 ∧ true) 
c  in CNF:
c     b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ false 
c  in DIMACS:
 17585 -17586 -17587  0
c  -3 does not represent an automaton state.
c    -( b^{61, 5}_2 ∧  b^{61, 5}_1 ∧  b^{61, 5}_0 ∧ true) 
c  in CNF:
c    -b^{61, 5}_2 ∨ -b^{61, 5}_1 ∨ -b^{61, 5}_0 ∨ false 
c  in DIMACS:
-17585 -17586 -17587  0

c i = 6
c  -2+1 --> -1
c    ( b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧  p_366) -> ( b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0)
c  in CNF:
c    -b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨  b^{61, 7}_2
c    -b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_1
c    -b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨  b^{61, 7}_0
c  in DIMACS:
-17588 -17589  17590 -366  17591 0
-17588 -17589  17590 -366 -17592 0
-17588 -17589  17590 -366  17593 0

c  -1+1 --> 0
c    ( b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0 ∧  p_366) -> (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧ -b^{61, 7}_0)
c  in CNF:
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_2
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_1
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_0
c  in DIMACS:
-17588  17589 -17590 -366 -17591 0
-17588  17589 -17590 -366 -17592 0
-17588  17589 -17590 -366 -17593 0

c  0+1 --> 1
c    (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧  p_366) -> (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0)
c  in CNF:
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_2
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_1
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨  b^{61, 7}_0
c  in DIMACS:
 17588  17589  17590 -366 -17591 0
 17588  17589  17590 -366 -17592 0
 17588  17589  17590 -366  17593 0

c  1+1 --> 2
c    (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0 ∧  p_366) -> (-b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0)
c  in CNF:
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_2
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨  b^{61, 7}_1
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ -p_366 ∨ -b^{61, 7}_0
c  in DIMACS:
 17588  17589 -17590 -366 -17591 0
 17588  17589 -17590 -366  17592 0
 17588  17589 -17590 -366 -17593 0

c  2+1 --> break 
c    (-b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧  p_366) -> break
c  in CNF:
c     b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 17588 -17589  17590 -366 1162 0


c  2-1 --> 1
c    (-b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧ -p_366) -> (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0)
c  in CNF:
c     b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_2
c     b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_1
c     b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨  b^{61, 7}_0
c  in DIMACS:
 17588 -17589  17590  366 -17591 0
 17588 -17589  17590  366 -17592 0
 17588 -17589  17590  366  17593 0

c  1-1 --> 0
c    (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0 ∧ -p_366) -> (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧ -b^{61, 7}_0)
c  in CNF:
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_2
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_1
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_0
c  in DIMACS:
 17588  17589 -17590  366 -17591 0
 17588  17589 -17590  366 -17592 0
 17588  17589 -17590  366 -17593 0

c  0-1 --> -1
c    (-b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧ -p_366) -> ( b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0)
c  in CNF:
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨  b^{61, 7}_2
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_1
c     b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨  b^{61, 7}_0
c  in DIMACS:
 17588  17589  17590  366  17591 0
 17588  17589  17590  366 -17592 0
 17588  17589  17590  366  17593 0

c  -1-1 --> -2
c    ( b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧  b^{61, 6}_0 ∧ -p_366) -> ( b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0)
c  in CNF:
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨  b^{61, 7}_2
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨  b^{61, 7}_1
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨  p_366 ∨ -b^{61, 7}_0
c  in DIMACS:
-17588  17589 -17590  366  17591 0
-17588  17589 -17590  366  17592 0
-17588  17589 -17590  366 -17593 0

c  -2-1 --> break 
c    ( b^{61, 6}_2 ∧  b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨  b^{61, 6}_0 ∨  p_366 ∨ break
c  in DIMACS:
-17588 -17589  17590  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 6}_2 ∧ -b^{61, 6}_1 ∧ -b^{61, 6}_0 ∧ true) 
c  in CNF:
c    -b^{61, 6}_2 ∨  b^{61, 6}_1 ∨  b^{61, 6}_0 ∨ false 
c  in DIMACS:
-17588  17589  17590  0

c  3 does not represent an automaton state.
c    -(-b^{61, 6}_2 ∧  b^{61, 6}_1 ∧  b^{61, 6}_0 ∧ true) 
c  in CNF:
c     b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ false 
c  in DIMACS:
 17588 -17589 -17590  0
c  -3 does not represent an automaton state.
c    -( b^{61, 6}_2 ∧  b^{61, 6}_1 ∧  b^{61, 6}_0 ∧ true) 
c  in CNF:
c    -b^{61, 6}_2 ∨ -b^{61, 6}_1 ∨ -b^{61, 6}_0 ∨ false 
c  in DIMACS:
-17588 -17589 -17590  0

c i = 7
c  -2+1 --> -1
c    ( b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧  p_427) -> ( b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0)
c  in CNF:
c    -b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨  b^{61, 8}_2
c    -b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_1
c    -b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨  b^{61, 8}_0
c  in DIMACS:
-17591 -17592  17593 -427  17594 0
-17591 -17592  17593 -427 -17595 0
-17591 -17592  17593 -427  17596 0

c  -1+1 --> 0
c    ( b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0 ∧  p_427) -> (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧ -b^{61, 8}_0)
c  in CNF:
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_2
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_1
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_0
c  in DIMACS:
-17591  17592 -17593 -427 -17594 0
-17591  17592 -17593 -427 -17595 0
-17591  17592 -17593 -427 -17596 0

c  0+1 --> 1
c    (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧  p_427) -> (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0)
c  in CNF:
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_2
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_1
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨  b^{61, 8}_0
c  in DIMACS:
 17591  17592  17593 -427 -17594 0
 17591  17592  17593 -427 -17595 0
 17591  17592  17593 -427  17596 0

c  1+1 --> 2
c    (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0 ∧  p_427) -> (-b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0)
c  in CNF:
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_2
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨  b^{61, 8}_1
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ -p_427 ∨ -b^{61, 8}_0
c  in DIMACS:
 17591  17592 -17593 -427 -17594 0
 17591  17592 -17593 -427  17595 0
 17591  17592 -17593 -427 -17596 0

c  2+1 --> break 
c    (-b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧  p_427) -> break
c  in CNF:
c     b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ -p_427 ∨ break
c  in DIMACS:
 17591 -17592  17593 -427 1162 0


c  2-1 --> 1
c    (-b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧ -p_427) -> (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0)
c  in CNF:
c     b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_2
c     b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_1
c     b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨  b^{61, 8}_0
c  in DIMACS:
 17591 -17592  17593  427 -17594 0
 17591 -17592  17593  427 -17595 0
 17591 -17592  17593  427  17596 0

c  1-1 --> 0
c    (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0 ∧ -p_427) -> (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧ -b^{61, 8}_0)
c  in CNF:
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_2
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_1
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_0
c  in DIMACS:
 17591  17592 -17593  427 -17594 0
 17591  17592 -17593  427 -17595 0
 17591  17592 -17593  427 -17596 0

c  0-1 --> -1
c    (-b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧ -p_427) -> ( b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0)
c  in CNF:
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨  b^{61, 8}_2
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_1
c     b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨  b^{61, 8}_0
c  in DIMACS:
 17591  17592  17593  427  17594 0
 17591  17592  17593  427 -17595 0
 17591  17592  17593  427  17596 0

c  -1-1 --> -2
c    ( b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧  b^{61, 7}_0 ∧ -p_427) -> ( b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0)
c  in CNF:
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨  b^{61, 8}_2
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨  b^{61, 8}_1
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨  p_427 ∨ -b^{61, 8}_0
c  in DIMACS:
-17591  17592 -17593  427  17594 0
-17591  17592 -17593  427  17595 0
-17591  17592 -17593  427 -17596 0

c  -2-1 --> break 
c    ( b^{61, 7}_2 ∧  b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧ -p_427) -> break
c  in CNF:
c    -b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨  b^{61, 7}_0 ∨  p_427 ∨ break
c  in DIMACS:
-17591 -17592  17593  427 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 7}_2 ∧ -b^{61, 7}_1 ∧ -b^{61, 7}_0 ∧ true) 
c  in CNF:
c    -b^{61, 7}_2 ∨  b^{61, 7}_1 ∨  b^{61, 7}_0 ∨ false 
c  in DIMACS:
-17591  17592  17593  0

c  3 does not represent an automaton state.
c    -(-b^{61, 7}_2 ∧  b^{61, 7}_1 ∧  b^{61, 7}_0 ∧ true) 
c  in CNF:
c     b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ false 
c  in DIMACS:
 17591 -17592 -17593  0
c  -3 does not represent an automaton state.
c    -( b^{61, 7}_2 ∧  b^{61, 7}_1 ∧  b^{61, 7}_0 ∧ true) 
c  in CNF:
c    -b^{61, 7}_2 ∨ -b^{61, 7}_1 ∨ -b^{61, 7}_0 ∨ false 
c  in DIMACS:
-17591 -17592 -17593  0

c i = 8
c  -2+1 --> -1
c    ( b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧  p_488) -> ( b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0)
c  in CNF:
c    -b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨  b^{61, 9}_2
c    -b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_1
c    -b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨  b^{61, 9}_0
c  in DIMACS:
-17594 -17595  17596 -488  17597 0
-17594 -17595  17596 -488 -17598 0
-17594 -17595  17596 -488  17599 0

c  -1+1 --> 0
c    ( b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0 ∧  p_488) -> (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧ -b^{61, 9}_0)
c  in CNF:
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_2
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_1
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_0
c  in DIMACS:
-17594  17595 -17596 -488 -17597 0
-17594  17595 -17596 -488 -17598 0
-17594  17595 -17596 -488 -17599 0

c  0+1 --> 1
c    (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧  p_488) -> (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0)
c  in CNF:
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_2
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_1
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨  b^{61, 9}_0
c  in DIMACS:
 17594  17595  17596 -488 -17597 0
 17594  17595  17596 -488 -17598 0
 17594  17595  17596 -488  17599 0

c  1+1 --> 2
c    (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0 ∧  p_488) -> (-b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0)
c  in CNF:
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_2
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨  b^{61, 9}_1
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ -p_488 ∨ -b^{61, 9}_0
c  in DIMACS:
 17594  17595 -17596 -488 -17597 0
 17594  17595 -17596 -488  17598 0
 17594  17595 -17596 -488 -17599 0

c  2+1 --> break 
c    (-b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧  p_488) -> break
c  in CNF:
c     b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 17594 -17595  17596 -488 1162 0


c  2-1 --> 1
c    (-b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧ -p_488) -> (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0)
c  in CNF:
c     b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_2
c     b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_1
c     b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨  b^{61, 9}_0
c  in DIMACS:
 17594 -17595  17596  488 -17597 0
 17594 -17595  17596  488 -17598 0
 17594 -17595  17596  488  17599 0

c  1-1 --> 0
c    (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0 ∧ -p_488) -> (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧ -b^{61, 9}_0)
c  in CNF:
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_2
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_1
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_0
c  in DIMACS:
 17594  17595 -17596  488 -17597 0
 17594  17595 -17596  488 -17598 0
 17594  17595 -17596  488 -17599 0

c  0-1 --> -1
c    (-b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧ -p_488) -> ( b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0)
c  in CNF:
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨  b^{61, 9}_2
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_1
c     b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨  b^{61, 9}_0
c  in DIMACS:
 17594  17595  17596  488  17597 0
 17594  17595  17596  488 -17598 0
 17594  17595  17596  488  17599 0

c  -1-1 --> -2
c    ( b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧  b^{61, 8}_0 ∧ -p_488) -> ( b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0)
c  in CNF:
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨  b^{61, 9}_2
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨  b^{61, 9}_1
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨  p_488 ∨ -b^{61, 9}_0
c  in DIMACS:
-17594  17595 -17596  488  17597 0
-17594  17595 -17596  488  17598 0
-17594  17595 -17596  488 -17599 0

c  -2-1 --> break 
c    ( b^{61, 8}_2 ∧  b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨  b^{61, 8}_0 ∨  p_488 ∨ break
c  in DIMACS:
-17594 -17595  17596  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 8}_2 ∧ -b^{61, 8}_1 ∧ -b^{61, 8}_0 ∧ true) 
c  in CNF:
c    -b^{61, 8}_2 ∨  b^{61, 8}_1 ∨  b^{61, 8}_0 ∨ false 
c  in DIMACS:
-17594  17595  17596  0

c  3 does not represent an automaton state.
c    -(-b^{61, 8}_2 ∧  b^{61, 8}_1 ∧  b^{61, 8}_0 ∧ true) 
c  in CNF:
c     b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ false 
c  in DIMACS:
 17594 -17595 -17596  0
c  -3 does not represent an automaton state.
c    -( b^{61, 8}_2 ∧  b^{61, 8}_1 ∧  b^{61, 8}_0 ∧ true) 
c  in CNF:
c    -b^{61, 8}_2 ∨ -b^{61, 8}_1 ∨ -b^{61, 8}_0 ∨ false 
c  in DIMACS:
-17594 -17595 -17596  0

c i = 9
c  -2+1 --> -1
c    ( b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧  p_549) -> ( b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0)
c  in CNF:
c    -b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨  b^{61, 10}_2
c    -b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_1
c    -b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨  b^{61, 10}_0
c  in DIMACS:
-17597 -17598  17599 -549  17600 0
-17597 -17598  17599 -549 -17601 0
-17597 -17598  17599 -549  17602 0

c  -1+1 --> 0
c    ( b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0 ∧  p_549) -> (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧ -b^{61, 10}_0)
c  in CNF:
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_2
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_1
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_0
c  in DIMACS:
-17597  17598 -17599 -549 -17600 0
-17597  17598 -17599 -549 -17601 0
-17597  17598 -17599 -549 -17602 0

c  0+1 --> 1
c    (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧  p_549) -> (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0)
c  in CNF:
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_2
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_1
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨  b^{61, 10}_0
c  in DIMACS:
 17597  17598  17599 -549 -17600 0
 17597  17598  17599 -549 -17601 0
 17597  17598  17599 -549  17602 0

c  1+1 --> 2
c    (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0 ∧  p_549) -> (-b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0)
c  in CNF:
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_2
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨  b^{61, 10}_1
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ -p_549 ∨ -b^{61, 10}_0
c  in DIMACS:
 17597  17598 -17599 -549 -17600 0
 17597  17598 -17599 -549  17601 0
 17597  17598 -17599 -549 -17602 0

c  2+1 --> break 
c    (-b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧  p_549) -> break
c  in CNF:
c     b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ -p_549 ∨ break
c  in DIMACS:
 17597 -17598  17599 -549 1162 0


c  2-1 --> 1
c    (-b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧ -p_549) -> (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0)
c  in CNF:
c     b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_2
c     b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_1
c     b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨  b^{61, 10}_0
c  in DIMACS:
 17597 -17598  17599  549 -17600 0
 17597 -17598  17599  549 -17601 0
 17597 -17598  17599  549  17602 0

c  1-1 --> 0
c    (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0 ∧ -p_549) -> (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧ -b^{61, 10}_0)
c  in CNF:
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_2
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_1
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_0
c  in DIMACS:
 17597  17598 -17599  549 -17600 0
 17597  17598 -17599  549 -17601 0
 17597  17598 -17599  549 -17602 0

c  0-1 --> -1
c    (-b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧ -p_549) -> ( b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0)
c  in CNF:
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨  b^{61, 10}_2
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_1
c     b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨  b^{61, 10}_0
c  in DIMACS:
 17597  17598  17599  549  17600 0
 17597  17598  17599  549 -17601 0
 17597  17598  17599  549  17602 0

c  -1-1 --> -2
c    ( b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧  b^{61, 9}_0 ∧ -p_549) -> ( b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0)
c  in CNF:
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨  b^{61, 10}_2
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨  b^{61, 10}_1
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨  p_549 ∨ -b^{61, 10}_0
c  in DIMACS:
-17597  17598 -17599  549  17600 0
-17597  17598 -17599  549  17601 0
-17597  17598 -17599  549 -17602 0

c  -2-1 --> break 
c    ( b^{61, 9}_2 ∧  b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧ -p_549) -> break
c  in CNF:
c    -b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨  b^{61, 9}_0 ∨  p_549 ∨ break
c  in DIMACS:
-17597 -17598  17599  549 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 9}_2 ∧ -b^{61, 9}_1 ∧ -b^{61, 9}_0 ∧ true) 
c  in CNF:
c    -b^{61, 9}_2 ∨  b^{61, 9}_1 ∨  b^{61, 9}_0 ∨ false 
c  in DIMACS:
-17597  17598  17599  0

c  3 does not represent an automaton state.
c    -(-b^{61, 9}_2 ∧  b^{61, 9}_1 ∧  b^{61, 9}_0 ∧ true) 
c  in CNF:
c     b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ false 
c  in DIMACS:
 17597 -17598 -17599  0
c  -3 does not represent an automaton state.
c    -( b^{61, 9}_2 ∧  b^{61, 9}_1 ∧  b^{61, 9}_0 ∧ true) 
c  in CNF:
c    -b^{61, 9}_2 ∨ -b^{61, 9}_1 ∨ -b^{61, 9}_0 ∨ false 
c  in DIMACS:
-17597 -17598 -17599  0

c i = 10
c  -2+1 --> -1
c    ( b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧  p_610) -> ( b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0)
c  in CNF:
c    -b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨  b^{61, 11}_2
c    -b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_1
c    -b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨  b^{61, 11}_0
c  in DIMACS:
-17600 -17601  17602 -610  17603 0
-17600 -17601  17602 -610 -17604 0
-17600 -17601  17602 -610  17605 0

c  -1+1 --> 0
c    ( b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0 ∧  p_610) -> (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧ -b^{61, 11}_0)
c  in CNF:
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_2
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_1
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_0
c  in DIMACS:
-17600  17601 -17602 -610 -17603 0
-17600  17601 -17602 -610 -17604 0
-17600  17601 -17602 -610 -17605 0

c  0+1 --> 1
c    (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧  p_610) -> (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0)
c  in CNF:
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_2
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_1
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨  b^{61, 11}_0
c  in DIMACS:
 17600  17601  17602 -610 -17603 0
 17600  17601  17602 -610 -17604 0
 17600  17601  17602 -610  17605 0

c  1+1 --> 2
c    (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0 ∧  p_610) -> (-b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0)
c  in CNF:
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_2
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨  b^{61, 11}_1
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ -p_610 ∨ -b^{61, 11}_0
c  in DIMACS:
 17600  17601 -17602 -610 -17603 0
 17600  17601 -17602 -610  17604 0
 17600  17601 -17602 -610 -17605 0

c  2+1 --> break 
c    (-b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧  p_610) -> break
c  in CNF:
c     b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 17600 -17601  17602 -610 1162 0


c  2-1 --> 1
c    (-b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧ -p_610) -> (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0)
c  in CNF:
c     b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_2
c     b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_1
c     b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨  b^{61, 11}_0
c  in DIMACS:
 17600 -17601  17602  610 -17603 0
 17600 -17601  17602  610 -17604 0
 17600 -17601  17602  610  17605 0

c  1-1 --> 0
c    (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0 ∧ -p_610) -> (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧ -b^{61, 11}_0)
c  in CNF:
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_2
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_1
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_0
c  in DIMACS:
 17600  17601 -17602  610 -17603 0
 17600  17601 -17602  610 -17604 0
 17600  17601 -17602  610 -17605 0

c  0-1 --> -1
c    (-b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧ -p_610) -> ( b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0)
c  in CNF:
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨  b^{61, 11}_2
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_1
c     b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨  b^{61, 11}_0
c  in DIMACS:
 17600  17601  17602  610  17603 0
 17600  17601  17602  610 -17604 0
 17600  17601  17602  610  17605 0

c  -1-1 --> -2
c    ( b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧  b^{61, 10}_0 ∧ -p_610) -> ( b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0)
c  in CNF:
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨  b^{61, 11}_2
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨  b^{61, 11}_1
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨  p_610 ∨ -b^{61, 11}_0
c  in DIMACS:
-17600  17601 -17602  610  17603 0
-17600  17601 -17602  610  17604 0
-17600  17601 -17602  610 -17605 0

c  -2-1 --> break 
c    ( b^{61, 10}_2 ∧  b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨  b^{61, 10}_0 ∨  p_610 ∨ break
c  in DIMACS:
-17600 -17601  17602  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 10}_2 ∧ -b^{61, 10}_1 ∧ -b^{61, 10}_0 ∧ true) 
c  in CNF:
c    -b^{61, 10}_2 ∨  b^{61, 10}_1 ∨  b^{61, 10}_0 ∨ false 
c  in DIMACS:
-17600  17601  17602  0

c  3 does not represent an automaton state.
c    -(-b^{61, 10}_2 ∧  b^{61, 10}_1 ∧  b^{61, 10}_0 ∧ true) 
c  in CNF:
c     b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ false 
c  in DIMACS:
 17600 -17601 -17602  0
c  -3 does not represent an automaton state.
c    -( b^{61, 10}_2 ∧  b^{61, 10}_1 ∧  b^{61, 10}_0 ∧ true) 
c  in CNF:
c    -b^{61, 10}_2 ∨ -b^{61, 10}_1 ∨ -b^{61, 10}_0 ∨ false 
c  in DIMACS:
-17600 -17601 -17602  0

c i = 11
c  -2+1 --> -1
c    ( b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧  p_671) -> ( b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0)
c  in CNF:
c    -b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨  b^{61, 12}_2
c    -b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_1
c    -b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨  b^{61, 12}_0
c  in DIMACS:
-17603 -17604  17605 -671  17606 0
-17603 -17604  17605 -671 -17607 0
-17603 -17604  17605 -671  17608 0

c  -1+1 --> 0
c    ( b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0 ∧  p_671) -> (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧ -b^{61, 12}_0)
c  in CNF:
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_2
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_1
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_0
c  in DIMACS:
-17603  17604 -17605 -671 -17606 0
-17603  17604 -17605 -671 -17607 0
-17603  17604 -17605 -671 -17608 0

c  0+1 --> 1
c    (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧  p_671) -> (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0)
c  in CNF:
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_2
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_1
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨  b^{61, 12}_0
c  in DIMACS:
 17603  17604  17605 -671 -17606 0
 17603  17604  17605 -671 -17607 0
 17603  17604  17605 -671  17608 0

c  1+1 --> 2
c    (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0 ∧  p_671) -> (-b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0)
c  in CNF:
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_2
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨  b^{61, 12}_1
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ -p_671 ∨ -b^{61, 12}_0
c  in DIMACS:
 17603  17604 -17605 -671 -17606 0
 17603  17604 -17605 -671  17607 0
 17603  17604 -17605 -671 -17608 0

c  2+1 --> break 
c    (-b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧  p_671) -> break
c  in CNF:
c     b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ -p_671 ∨ break
c  in DIMACS:
 17603 -17604  17605 -671 1162 0


c  2-1 --> 1
c    (-b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧ -p_671) -> (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0)
c  in CNF:
c     b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_2
c     b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_1
c     b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨  b^{61, 12}_0
c  in DIMACS:
 17603 -17604  17605  671 -17606 0
 17603 -17604  17605  671 -17607 0
 17603 -17604  17605  671  17608 0

c  1-1 --> 0
c    (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0 ∧ -p_671) -> (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧ -b^{61, 12}_0)
c  in CNF:
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_2
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_1
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_0
c  in DIMACS:
 17603  17604 -17605  671 -17606 0
 17603  17604 -17605  671 -17607 0
 17603  17604 -17605  671 -17608 0

c  0-1 --> -1
c    (-b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧ -p_671) -> ( b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0)
c  in CNF:
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨  b^{61, 12}_2
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_1
c     b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨  b^{61, 12}_0
c  in DIMACS:
 17603  17604  17605  671  17606 0
 17603  17604  17605  671 -17607 0
 17603  17604  17605  671  17608 0

c  -1-1 --> -2
c    ( b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧  b^{61, 11}_0 ∧ -p_671) -> ( b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0)
c  in CNF:
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨  b^{61, 12}_2
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨  b^{61, 12}_1
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨  p_671 ∨ -b^{61, 12}_0
c  in DIMACS:
-17603  17604 -17605  671  17606 0
-17603  17604 -17605  671  17607 0
-17603  17604 -17605  671 -17608 0

c  -2-1 --> break 
c    ( b^{61, 11}_2 ∧  b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧ -p_671) -> break
c  in CNF:
c    -b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨  b^{61, 11}_0 ∨  p_671 ∨ break
c  in DIMACS:
-17603 -17604  17605  671 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 11}_2 ∧ -b^{61, 11}_1 ∧ -b^{61, 11}_0 ∧ true) 
c  in CNF:
c    -b^{61, 11}_2 ∨  b^{61, 11}_1 ∨  b^{61, 11}_0 ∨ false 
c  in DIMACS:
-17603  17604  17605  0

c  3 does not represent an automaton state.
c    -(-b^{61, 11}_2 ∧  b^{61, 11}_1 ∧  b^{61, 11}_0 ∧ true) 
c  in CNF:
c     b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ false 
c  in DIMACS:
 17603 -17604 -17605  0
c  -3 does not represent an automaton state.
c    -( b^{61, 11}_2 ∧  b^{61, 11}_1 ∧  b^{61, 11}_0 ∧ true) 
c  in CNF:
c    -b^{61, 11}_2 ∨ -b^{61, 11}_1 ∨ -b^{61, 11}_0 ∨ false 
c  in DIMACS:
-17603 -17604 -17605  0

c i = 12
c  -2+1 --> -1
c    ( b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧  p_732) -> ( b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0)
c  in CNF:
c    -b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨  b^{61, 13}_2
c    -b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_1
c    -b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨  b^{61, 13}_0
c  in DIMACS:
-17606 -17607  17608 -732  17609 0
-17606 -17607  17608 -732 -17610 0
-17606 -17607  17608 -732  17611 0

c  -1+1 --> 0
c    ( b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0 ∧  p_732) -> (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧ -b^{61, 13}_0)
c  in CNF:
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_2
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_1
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_0
c  in DIMACS:
-17606  17607 -17608 -732 -17609 0
-17606  17607 -17608 -732 -17610 0
-17606  17607 -17608 -732 -17611 0

c  0+1 --> 1
c    (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧  p_732) -> (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0)
c  in CNF:
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_2
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_1
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨  b^{61, 13}_0
c  in DIMACS:
 17606  17607  17608 -732 -17609 0
 17606  17607  17608 -732 -17610 0
 17606  17607  17608 -732  17611 0

c  1+1 --> 2
c    (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0 ∧  p_732) -> (-b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0)
c  in CNF:
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_2
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨  b^{61, 13}_1
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ -p_732 ∨ -b^{61, 13}_0
c  in DIMACS:
 17606  17607 -17608 -732 -17609 0
 17606  17607 -17608 -732  17610 0
 17606  17607 -17608 -732 -17611 0

c  2+1 --> break 
c    (-b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧  p_732) -> break
c  in CNF:
c     b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 17606 -17607  17608 -732 1162 0


c  2-1 --> 1
c    (-b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧ -p_732) -> (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0)
c  in CNF:
c     b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_2
c     b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_1
c     b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨  b^{61, 13}_0
c  in DIMACS:
 17606 -17607  17608  732 -17609 0
 17606 -17607  17608  732 -17610 0
 17606 -17607  17608  732  17611 0

c  1-1 --> 0
c    (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0 ∧ -p_732) -> (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧ -b^{61, 13}_0)
c  in CNF:
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_2
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_1
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_0
c  in DIMACS:
 17606  17607 -17608  732 -17609 0
 17606  17607 -17608  732 -17610 0
 17606  17607 -17608  732 -17611 0

c  0-1 --> -1
c    (-b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧ -p_732) -> ( b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0)
c  in CNF:
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨  b^{61, 13}_2
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_1
c     b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨  b^{61, 13}_0
c  in DIMACS:
 17606  17607  17608  732  17609 0
 17606  17607  17608  732 -17610 0
 17606  17607  17608  732  17611 0

c  -1-1 --> -2
c    ( b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧  b^{61, 12}_0 ∧ -p_732) -> ( b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0)
c  in CNF:
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨  b^{61, 13}_2
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨  b^{61, 13}_1
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨  p_732 ∨ -b^{61, 13}_0
c  in DIMACS:
-17606  17607 -17608  732  17609 0
-17606  17607 -17608  732  17610 0
-17606  17607 -17608  732 -17611 0

c  -2-1 --> break 
c    ( b^{61, 12}_2 ∧  b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨  b^{61, 12}_0 ∨  p_732 ∨ break
c  in DIMACS:
-17606 -17607  17608  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 12}_2 ∧ -b^{61, 12}_1 ∧ -b^{61, 12}_0 ∧ true) 
c  in CNF:
c    -b^{61, 12}_2 ∨  b^{61, 12}_1 ∨  b^{61, 12}_0 ∨ false 
c  in DIMACS:
-17606  17607  17608  0

c  3 does not represent an automaton state.
c    -(-b^{61, 12}_2 ∧  b^{61, 12}_1 ∧  b^{61, 12}_0 ∧ true) 
c  in CNF:
c     b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ false 
c  in DIMACS:
 17606 -17607 -17608  0
c  -3 does not represent an automaton state.
c    -( b^{61, 12}_2 ∧  b^{61, 12}_1 ∧  b^{61, 12}_0 ∧ true) 
c  in CNF:
c    -b^{61, 12}_2 ∨ -b^{61, 12}_1 ∨ -b^{61, 12}_0 ∨ false 
c  in DIMACS:
-17606 -17607 -17608  0

c i = 13
c  -2+1 --> -1
c    ( b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧  p_793) -> ( b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0)
c  in CNF:
c    -b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨  b^{61, 14}_2
c    -b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_1
c    -b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨  b^{61, 14}_0
c  in DIMACS:
-17609 -17610  17611 -793  17612 0
-17609 -17610  17611 -793 -17613 0
-17609 -17610  17611 -793  17614 0

c  -1+1 --> 0
c    ( b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0 ∧  p_793) -> (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧ -b^{61, 14}_0)
c  in CNF:
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_2
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_1
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_0
c  in DIMACS:
-17609  17610 -17611 -793 -17612 0
-17609  17610 -17611 -793 -17613 0
-17609  17610 -17611 -793 -17614 0

c  0+1 --> 1
c    (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧  p_793) -> (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0)
c  in CNF:
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_2
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_1
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨  b^{61, 14}_0
c  in DIMACS:
 17609  17610  17611 -793 -17612 0
 17609  17610  17611 -793 -17613 0
 17609  17610  17611 -793  17614 0

c  1+1 --> 2
c    (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0 ∧  p_793) -> (-b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0)
c  in CNF:
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_2
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨  b^{61, 14}_1
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ -p_793 ∨ -b^{61, 14}_0
c  in DIMACS:
 17609  17610 -17611 -793 -17612 0
 17609  17610 -17611 -793  17613 0
 17609  17610 -17611 -793 -17614 0

c  2+1 --> break 
c    (-b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧  p_793) -> break
c  in CNF:
c     b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ -p_793 ∨ break
c  in DIMACS:
 17609 -17610  17611 -793 1162 0


c  2-1 --> 1
c    (-b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧ -p_793) -> (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0)
c  in CNF:
c     b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_2
c     b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_1
c     b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨  b^{61, 14}_0
c  in DIMACS:
 17609 -17610  17611  793 -17612 0
 17609 -17610  17611  793 -17613 0
 17609 -17610  17611  793  17614 0

c  1-1 --> 0
c    (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0 ∧ -p_793) -> (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧ -b^{61, 14}_0)
c  in CNF:
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_2
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_1
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_0
c  in DIMACS:
 17609  17610 -17611  793 -17612 0
 17609  17610 -17611  793 -17613 0
 17609  17610 -17611  793 -17614 0

c  0-1 --> -1
c    (-b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧ -p_793) -> ( b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0)
c  in CNF:
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨  b^{61, 14}_2
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_1
c     b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨  b^{61, 14}_0
c  in DIMACS:
 17609  17610  17611  793  17612 0
 17609  17610  17611  793 -17613 0
 17609  17610  17611  793  17614 0

c  -1-1 --> -2
c    ( b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧  b^{61, 13}_0 ∧ -p_793) -> ( b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0)
c  in CNF:
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨  b^{61, 14}_2
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨  b^{61, 14}_1
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨  p_793 ∨ -b^{61, 14}_0
c  in DIMACS:
-17609  17610 -17611  793  17612 0
-17609  17610 -17611  793  17613 0
-17609  17610 -17611  793 -17614 0

c  -2-1 --> break 
c    ( b^{61, 13}_2 ∧  b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧ -p_793) -> break
c  in CNF:
c    -b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨  b^{61, 13}_0 ∨  p_793 ∨ break
c  in DIMACS:
-17609 -17610  17611  793 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 13}_2 ∧ -b^{61, 13}_1 ∧ -b^{61, 13}_0 ∧ true) 
c  in CNF:
c    -b^{61, 13}_2 ∨  b^{61, 13}_1 ∨  b^{61, 13}_0 ∨ false 
c  in DIMACS:
-17609  17610  17611  0

c  3 does not represent an automaton state.
c    -(-b^{61, 13}_2 ∧  b^{61, 13}_1 ∧  b^{61, 13}_0 ∧ true) 
c  in CNF:
c     b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ false 
c  in DIMACS:
 17609 -17610 -17611  0
c  -3 does not represent an automaton state.
c    -( b^{61, 13}_2 ∧  b^{61, 13}_1 ∧  b^{61, 13}_0 ∧ true) 
c  in CNF:
c    -b^{61, 13}_2 ∨ -b^{61, 13}_1 ∨ -b^{61, 13}_0 ∨ false 
c  in DIMACS:
-17609 -17610 -17611  0

c i = 14
c  -2+1 --> -1
c    ( b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧  p_854) -> ( b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0)
c  in CNF:
c    -b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨  b^{61, 15}_2
c    -b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_1
c    -b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨  b^{61, 15}_0
c  in DIMACS:
-17612 -17613  17614 -854  17615 0
-17612 -17613  17614 -854 -17616 0
-17612 -17613  17614 -854  17617 0

c  -1+1 --> 0
c    ( b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0 ∧  p_854) -> (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧ -b^{61, 15}_0)
c  in CNF:
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_2
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_1
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_0
c  in DIMACS:
-17612  17613 -17614 -854 -17615 0
-17612  17613 -17614 -854 -17616 0
-17612  17613 -17614 -854 -17617 0

c  0+1 --> 1
c    (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧  p_854) -> (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0)
c  in CNF:
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_2
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_1
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨  b^{61, 15}_0
c  in DIMACS:
 17612  17613  17614 -854 -17615 0
 17612  17613  17614 -854 -17616 0
 17612  17613  17614 -854  17617 0

c  1+1 --> 2
c    (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0 ∧  p_854) -> (-b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0)
c  in CNF:
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_2
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨  b^{61, 15}_1
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ -p_854 ∨ -b^{61, 15}_0
c  in DIMACS:
 17612  17613 -17614 -854 -17615 0
 17612  17613 -17614 -854  17616 0
 17612  17613 -17614 -854 -17617 0

c  2+1 --> break 
c    (-b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧  p_854) -> break
c  in CNF:
c     b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 17612 -17613  17614 -854 1162 0


c  2-1 --> 1
c    (-b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧ -p_854) -> (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0)
c  in CNF:
c     b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_2
c     b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_1
c     b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨  b^{61, 15}_0
c  in DIMACS:
 17612 -17613  17614  854 -17615 0
 17612 -17613  17614  854 -17616 0
 17612 -17613  17614  854  17617 0

c  1-1 --> 0
c    (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0 ∧ -p_854) -> (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧ -b^{61, 15}_0)
c  in CNF:
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_2
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_1
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_0
c  in DIMACS:
 17612  17613 -17614  854 -17615 0
 17612  17613 -17614  854 -17616 0
 17612  17613 -17614  854 -17617 0

c  0-1 --> -1
c    (-b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧ -p_854) -> ( b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0)
c  in CNF:
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨  b^{61, 15}_2
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_1
c     b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨  b^{61, 15}_0
c  in DIMACS:
 17612  17613  17614  854  17615 0
 17612  17613  17614  854 -17616 0
 17612  17613  17614  854  17617 0

c  -1-1 --> -2
c    ( b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧  b^{61, 14}_0 ∧ -p_854) -> ( b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0)
c  in CNF:
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨  b^{61, 15}_2
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨  b^{61, 15}_1
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨  p_854 ∨ -b^{61, 15}_0
c  in DIMACS:
-17612  17613 -17614  854  17615 0
-17612  17613 -17614  854  17616 0
-17612  17613 -17614  854 -17617 0

c  -2-1 --> break 
c    ( b^{61, 14}_2 ∧  b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨  b^{61, 14}_0 ∨  p_854 ∨ break
c  in DIMACS:
-17612 -17613  17614  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 14}_2 ∧ -b^{61, 14}_1 ∧ -b^{61, 14}_0 ∧ true) 
c  in CNF:
c    -b^{61, 14}_2 ∨  b^{61, 14}_1 ∨  b^{61, 14}_0 ∨ false 
c  in DIMACS:
-17612  17613  17614  0

c  3 does not represent an automaton state.
c    -(-b^{61, 14}_2 ∧  b^{61, 14}_1 ∧  b^{61, 14}_0 ∧ true) 
c  in CNF:
c     b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ false 
c  in DIMACS:
 17612 -17613 -17614  0
c  -3 does not represent an automaton state.
c    -( b^{61, 14}_2 ∧  b^{61, 14}_1 ∧  b^{61, 14}_0 ∧ true) 
c  in CNF:
c    -b^{61, 14}_2 ∨ -b^{61, 14}_1 ∨ -b^{61, 14}_0 ∨ false 
c  in DIMACS:
-17612 -17613 -17614  0

c i = 15
c  -2+1 --> -1
c    ( b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧  p_915) -> ( b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0)
c  in CNF:
c    -b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨  b^{61, 16}_2
c    -b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_1
c    -b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨  b^{61, 16}_0
c  in DIMACS:
-17615 -17616  17617 -915  17618 0
-17615 -17616  17617 -915 -17619 0
-17615 -17616  17617 -915  17620 0

c  -1+1 --> 0
c    ( b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0 ∧  p_915) -> (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧ -b^{61, 16}_0)
c  in CNF:
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_2
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_1
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_0
c  in DIMACS:
-17615  17616 -17617 -915 -17618 0
-17615  17616 -17617 -915 -17619 0
-17615  17616 -17617 -915 -17620 0

c  0+1 --> 1
c    (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧  p_915) -> (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0)
c  in CNF:
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_2
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_1
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨  b^{61, 16}_0
c  in DIMACS:
 17615  17616  17617 -915 -17618 0
 17615  17616  17617 -915 -17619 0
 17615  17616  17617 -915  17620 0

c  1+1 --> 2
c    (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0 ∧  p_915) -> (-b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0)
c  in CNF:
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_2
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨  b^{61, 16}_1
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ -p_915 ∨ -b^{61, 16}_0
c  in DIMACS:
 17615  17616 -17617 -915 -17618 0
 17615  17616 -17617 -915  17619 0
 17615  17616 -17617 -915 -17620 0

c  2+1 --> break 
c    (-b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧  p_915) -> break
c  in CNF:
c     b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 17615 -17616  17617 -915 1162 0


c  2-1 --> 1
c    (-b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧ -p_915) -> (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0)
c  in CNF:
c     b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_2
c     b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_1
c     b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨  b^{61, 16}_0
c  in DIMACS:
 17615 -17616  17617  915 -17618 0
 17615 -17616  17617  915 -17619 0
 17615 -17616  17617  915  17620 0

c  1-1 --> 0
c    (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0 ∧ -p_915) -> (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧ -b^{61, 16}_0)
c  in CNF:
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_2
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_1
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_0
c  in DIMACS:
 17615  17616 -17617  915 -17618 0
 17615  17616 -17617  915 -17619 0
 17615  17616 -17617  915 -17620 0

c  0-1 --> -1
c    (-b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧ -p_915) -> ( b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0)
c  in CNF:
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨  b^{61, 16}_2
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_1
c     b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨  b^{61, 16}_0
c  in DIMACS:
 17615  17616  17617  915  17618 0
 17615  17616  17617  915 -17619 0
 17615  17616  17617  915  17620 0

c  -1-1 --> -2
c    ( b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧  b^{61, 15}_0 ∧ -p_915) -> ( b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0)
c  in CNF:
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨  b^{61, 16}_2
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨  b^{61, 16}_1
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨  p_915 ∨ -b^{61, 16}_0
c  in DIMACS:
-17615  17616 -17617  915  17618 0
-17615  17616 -17617  915  17619 0
-17615  17616 -17617  915 -17620 0

c  -2-1 --> break 
c    ( b^{61, 15}_2 ∧  b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨  b^{61, 15}_0 ∨  p_915 ∨ break
c  in DIMACS:
-17615 -17616  17617  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 15}_2 ∧ -b^{61, 15}_1 ∧ -b^{61, 15}_0 ∧ true) 
c  in CNF:
c    -b^{61, 15}_2 ∨  b^{61, 15}_1 ∨  b^{61, 15}_0 ∨ false 
c  in DIMACS:
-17615  17616  17617  0

c  3 does not represent an automaton state.
c    -(-b^{61, 15}_2 ∧  b^{61, 15}_1 ∧  b^{61, 15}_0 ∧ true) 
c  in CNF:
c     b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ false 
c  in DIMACS:
 17615 -17616 -17617  0
c  -3 does not represent an automaton state.
c    -( b^{61, 15}_2 ∧  b^{61, 15}_1 ∧  b^{61, 15}_0 ∧ true) 
c  in CNF:
c    -b^{61, 15}_2 ∨ -b^{61, 15}_1 ∨ -b^{61, 15}_0 ∨ false 
c  in DIMACS:
-17615 -17616 -17617  0

c i = 16
c  -2+1 --> -1
c    ( b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧  p_976) -> ( b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0)
c  in CNF:
c    -b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨  b^{61, 17}_2
c    -b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_1
c    -b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨  b^{61, 17}_0
c  in DIMACS:
-17618 -17619  17620 -976  17621 0
-17618 -17619  17620 -976 -17622 0
-17618 -17619  17620 -976  17623 0

c  -1+1 --> 0
c    ( b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0 ∧  p_976) -> (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧ -b^{61, 17}_0)
c  in CNF:
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_2
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_1
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_0
c  in DIMACS:
-17618  17619 -17620 -976 -17621 0
-17618  17619 -17620 -976 -17622 0
-17618  17619 -17620 -976 -17623 0

c  0+1 --> 1
c    (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧  p_976) -> (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0)
c  in CNF:
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_2
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_1
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨  b^{61, 17}_0
c  in DIMACS:
 17618  17619  17620 -976 -17621 0
 17618  17619  17620 -976 -17622 0
 17618  17619  17620 -976  17623 0

c  1+1 --> 2
c    (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0 ∧  p_976) -> (-b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0)
c  in CNF:
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_2
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨  b^{61, 17}_1
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ -p_976 ∨ -b^{61, 17}_0
c  in DIMACS:
 17618  17619 -17620 -976 -17621 0
 17618  17619 -17620 -976  17622 0
 17618  17619 -17620 -976 -17623 0

c  2+1 --> break 
c    (-b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧  p_976) -> break
c  in CNF:
c     b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 17618 -17619  17620 -976 1162 0


c  2-1 --> 1
c    (-b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧ -p_976) -> (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0)
c  in CNF:
c     b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_2
c     b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_1
c     b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨  b^{61, 17}_0
c  in DIMACS:
 17618 -17619  17620  976 -17621 0
 17618 -17619  17620  976 -17622 0
 17618 -17619  17620  976  17623 0

c  1-1 --> 0
c    (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0 ∧ -p_976) -> (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧ -b^{61, 17}_0)
c  in CNF:
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_2
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_1
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_0
c  in DIMACS:
 17618  17619 -17620  976 -17621 0
 17618  17619 -17620  976 -17622 0
 17618  17619 -17620  976 -17623 0

c  0-1 --> -1
c    (-b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧ -p_976) -> ( b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0)
c  in CNF:
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨  b^{61, 17}_2
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_1
c     b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨  b^{61, 17}_0
c  in DIMACS:
 17618  17619  17620  976  17621 0
 17618  17619  17620  976 -17622 0
 17618  17619  17620  976  17623 0

c  -1-1 --> -2
c    ( b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧  b^{61, 16}_0 ∧ -p_976) -> ( b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0)
c  in CNF:
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨  b^{61, 17}_2
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨  b^{61, 17}_1
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨  p_976 ∨ -b^{61, 17}_0
c  in DIMACS:
-17618  17619 -17620  976  17621 0
-17618  17619 -17620  976  17622 0
-17618  17619 -17620  976 -17623 0

c  -2-1 --> break 
c    ( b^{61, 16}_2 ∧  b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨  b^{61, 16}_0 ∨  p_976 ∨ break
c  in DIMACS:
-17618 -17619  17620  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 16}_2 ∧ -b^{61, 16}_1 ∧ -b^{61, 16}_0 ∧ true) 
c  in CNF:
c    -b^{61, 16}_2 ∨  b^{61, 16}_1 ∨  b^{61, 16}_0 ∨ false 
c  in DIMACS:
-17618  17619  17620  0

c  3 does not represent an automaton state.
c    -(-b^{61, 16}_2 ∧  b^{61, 16}_1 ∧  b^{61, 16}_0 ∧ true) 
c  in CNF:
c     b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ false 
c  in DIMACS:
 17618 -17619 -17620  0
c  -3 does not represent an automaton state.
c    -( b^{61, 16}_2 ∧  b^{61, 16}_1 ∧  b^{61, 16}_0 ∧ true) 
c  in CNF:
c    -b^{61, 16}_2 ∨ -b^{61, 16}_1 ∨ -b^{61, 16}_0 ∨ false 
c  in DIMACS:
-17618 -17619 -17620  0

c i = 17
c  -2+1 --> -1
c    ( b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧  p_1037) -> ( b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0)
c  in CNF:
c    -b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨  b^{61, 18}_2
c    -b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_1
c    -b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨  b^{61, 18}_0
c  in DIMACS:
-17621 -17622  17623 -1037  17624 0
-17621 -17622  17623 -1037 -17625 0
-17621 -17622  17623 -1037  17626 0

c  -1+1 --> 0
c    ( b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0 ∧  p_1037) -> (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧ -b^{61, 18}_0)
c  in CNF:
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_2
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_1
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_0
c  in DIMACS:
-17621  17622 -17623 -1037 -17624 0
-17621  17622 -17623 -1037 -17625 0
-17621  17622 -17623 -1037 -17626 0

c  0+1 --> 1
c    (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧  p_1037) -> (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0)
c  in CNF:
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_2
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_1
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨  b^{61, 18}_0
c  in DIMACS:
 17621  17622  17623 -1037 -17624 0
 17621  17622  17623 -1037 -17625 0
 17621  17622  17623 -1037  17626 0

c  1+1 --> 2
c    (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0 ∧  p_1037) -> (-b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0)
c  in CNF:
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_2
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨  b^{61, 18}_1
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ -p_1037 ∨ -b^{61, 18}_0
c  in DIMACS:
 17621  17622 -17623 -1037 -17624 0
 17621  17622 -17623 -1037  17625 0
 17621  17622 -17623 -1037 -17626 0

c  2+1 --> break 
c    (-b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧  p_1037) -> break
c  in CNF:
c     b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ -p_1037 ∨ break
c  in DIMACS:
 17621 -17622  17623 -1037 1162 0


c  2-1 --> 1
c    (-b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧ -p_1037) -> (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0)
c  in CNF:
c     b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_2
c     b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_1
c     b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨  b^{61, 18}_0
c  in DIMACS:
 17621 -17622  17623  1037 -17624 0
 17621 -17622  17623  1037 -17625 0
 17621 -17622  17623  1037  17626 0

c  1-1 --> 0
c    (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0 ∧ -p_1037) -> (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧ -b^{61, 18}_0)
c  in CNF:
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_2
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_1
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_0
c  in DIMACS:
 17621  17622 -17623  1037 -17624 0
 17621  17622 -17623  1037 -17625 0
 17621  17622 -17623  1037 -17626 0

c  0-1 --> -1
c    (-b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧ -p_1037) -> ( b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0)
c  in CNF:
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨  b^{61, 18}_2
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_1
c     b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨  b^{61, 18}_0
c  in DIMACS:
 17621  17622  17623  1037  17624 0
 17621  17622  17623  1037 -17625 0
 17621  17622  17623  1037  17626 0

c  -1-1 --> -2
c    ( b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧  b^{61, 17}_0 ∧ -p_1037) -> ( b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0)
c  in CNF:
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨  b^{61, 18}_2
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨  b^{61, 18}_1
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨  p_1037 ∨ -b^{61, 18}_0
c  in DIMACS:
-17621  17622 -17623  1037  17624 0
-17621  17622 -17623  1037  17625 0
-17621  17622 -17623  1037 -17626 0

c  -2-1 --> break 
c    ( b^{61, 17}_2 ∧  b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧ -p_1037) -> break
c  in CNF:
c    -b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨  b^{61, 17}_0 ∨  p_1037 ∨ break
c  in DIMACS:
-17621 -17622  17623  1037 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 17}_2 ∧ -b^{61, 17}_1 ∧ -b^{61, 17}_0 ∧ true) 
c  in CNF:
c    -b^{61, 17}_2 ∨  b^{61, 17}_1 ∨  b^{61, 17}_0 ∨ false 
c  in DIMACS:
-17621  17622  17623  0

c  3 does not represent an automaton state.
c    -(-b^{61, 17}_2 ∧  b^{61, 17}_1 ∧  b^{61, 17}_0 ∧ true) 
c  in CNF:
c     b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ false 
c  in DIMACS:
 17621 -17622 -17623  0
c  -3 does not represent an automaton state.
c    -( b^{61, 17}_2 ∧  b^{61, 17}_1 ∧  b^{61, 17}_0 ∧ true) 
c  in CNF:
c    -b^{61, 17}_2 ∨ -b^{61, 17}_1 ∨ -b^{61, 17}_0 ∨ false 
c  in DIMACS:
-17621 -17622 -17623  0

c i = 18
c  -2+1 --> -1
c    ( b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧  p_1098) -> ( b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0)
c  in CNF:
c    -b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨  b^{61, 19}_2
c    -b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_1
c    -b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨  b^{61, 19}_0
c  in DIMACS:
-17624 -17625  17626 -1098  17627 0
-17624 -17625  17626 -1098 -17628 0
-17624 -17625  17626 -1098  17629 0

c  -1+1 --> 0
c    ( b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0 ∧  p_1098) -> (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧ -b^{61, 19}_0)
c  in CNF:
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_2
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_1
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_0
c  in DIMACS:
-17624  17625 -17626 -1098 -17627 0
-17624  17625 -17626 -1098 -17628 0
-17624  17625 -17626 -1098 -17629 0

c  0+1 --> 1
c    (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧  p_1098) -> (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0)
c  in CNF:
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_2
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_1
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨  b^{61, 19}_0
c  in DIMACS:
 17624  17625  17626 -1098 -17627 0
 17624  17625  17626 -1098 -17628 0
 17624  17625  17626 -1098  17629 0

c  1+1 --> 2
c    (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0 ∧  p_1098) -> (-b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0)
c  in CNF:
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_2
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨  b^{61, 19}_1
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ -p_1098 ∨ -b^{61, 19}_0
c  in DIMACS:
 17624  17625 -17626 -1098 -17627 0
 17624  17625 -17626 -1098  17628 0
 17624  17625 -17626 -1098 -17629 0

c  2+1 --> break 
c    (-b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 17624 -17625  17626 -1098 1162 0


c  2-1 --> 1
c    (-b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧ -p_1098) -> (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0)
c  in CNF:
c     b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_2
c     b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_1
c     b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨  b^{61, 19}_0
c  in DIMACS:
 17624 -17625  17626  1098 -17627 0
 17624 -17625  17626  1098 -17628 0
 17624 -17625  17626  1098  17629 0

c  1-1 --> 0
c    (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0 ∧ -p_1098) -> (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧ -b^{61, 19}_0)
c  in CNF:
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_2
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_1
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_0
c  in DIMACS:
 17624  17625 -17626  1098 -17627 0
 17624  17625 -17626  1098 -17628 0
 17624  17625 -17626  1098 -17629 0

c  0-1 --> -1
c    (-b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧ -p_1098) -> ( b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0)
c  in CNF:
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨  b^{61, 19}_2
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_1
c     b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨  b^{61, 19}_0
c  in DIMACS:
 17624  17625  17626  1098  17627 0
 17624  17625  17626  1098 -17628 0
 17624  17625  17626  1098  17629 0

c  -1-1 --> -2
c    ( b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧  b^{61, 18}_0 ∧ -p_1098) -> ( b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0)
c  in CNF:
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨  b^{61, 19}_2
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨  b^{61, 19}_1
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨  p_1098 ∨ -b^{61, 19}_0
c  in DIMACS:
-17624  17625 -17626  1098  17627 0
-17624  17625 -17626  1098  17628 0
-17624  17625 -17626  1098 -17629 0

c  -2-1 --> break 
c    ( b^{61, 18}_2 ∧  b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨  b^{61, 18}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-17624 -17625  17626  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 18}_2 ∧ -b^{61, 18}_1 ∧ -b^{61, 18}_0 ∧ true) 
c  in CNF:
c    -b^{61, 18}_2 ∨  b^{61, 18}_1 ∨  b^{61, 18}_0 ∨ false 
c  in DIMACS:
-17624  17625  17626  0

c  3 does not represent an automaton state.
c    -(-b^{61, 18}_2 ∧  b^{61, 18}_1 ∧  b^{61, 18}_0 ∧ true) 
c  in CNF:
c     b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ false 
c  in DIMACS:
 17624 -17625 -17626  0
c  -3 does not represent an automaton state.
c    -( b^{61, 18}_2 ∧  b^{61, 18}_1 ∧  b^{61, 18}_0 ∧ true) 
c  in CNF:
c    -b^{61, 18}_2 ∨ -b^{61, 18}_1 ∨ -b^{61, 18}_0 ∨ false 
c  in DIMACS:
-17624 -17625 -17626  0

c i = 19
c  -2+1 --> -1
c    ( b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧  p_1159) -> ( b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧  b^{61, 20}_0)
c  in CNF:
c    -b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨  b^{61, 20}_2
c    -b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_1
c    -b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨  b^{61, 20}_0
c  in DIMACS:
-17627 -17628  17629 -1159  17630 0
-17627 -17628  17629 -1159 -17631 0
-17627 -17628  17629 -1159  17632 0

c  -1+1 --> 0
c    ( b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0 ∧  p_1159) -> (-b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧ -b^{61, 20}_0)
c  in CNF:
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_2
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_1
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_0
c  in DIMACS:
-17627  17628 -17629 -1159 -17630 0
-17627  17628 -17629 -1159 -17631 0
-17627  17628 -17629 -1159 -17632 0

c  0+1 --> 1
c    (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧  p_1159) -> (-b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧  b^{61, 20}_0)
c  in CNF:
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_2
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_1
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨  b^{61, 20}_0
c  in DIMACS:
 17627  17628  17629 -1159 -17630 0
 17627  17628  17629 -1159 -17631 0
 17627  17628  17629 -1159  17632 0

c  1+1 --> 2
c    (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0 ∧  p_1159) -> (-b^{61, 20}_2 ∧  b^{61, 20}_1 ∧ -b^{61, 20}_0)
c  in CNF:
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_2
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨  b^{61, 20}_1
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ -p_1159 ∨ -b^{61, 20}_0
c  in DIMACS:
 17627  17628 -17629 -1159 -17630 0
 17627  17628 -17629 -1159  17631 0
 17627  17628 -17629 -1159 -17632 0

c  2+1 --> break 
c    (-b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧  p_1159) -> break
c  in CNF:
c     b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ -p_1159 ∨ break
c  in DIMACS:
 17627 -17628  17629 -1159 1162 0


c  2-1 --> 1
c    (-b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧ -p_1159) -> (-b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧  b^{61, 20}_0)
c  in CNF:
c     b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_2
c     b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_1
c     b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨  b^{61, 20}_0
c  in DIMACS:
 17627 -17628  17629  1159 -17630 0
 17627 -17628  17629  1159 -17631 0
 17627 -17628  17629  1159  17632 0

c  1-1 --> 0
c    (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0 ∧ -p_1159) -> (-b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧ -b^{61, 20}_0)
c  in CNF:
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_2
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_1
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_0
c  in DIMACS:
 17627  17628 -17629  1159 -17630 0
 17627  17628 -17629  1159 -17631 0
 17627  17628 -17629  1159 -17632 0

c  0-1 --> -1
c    (-b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧ -p_1159) -> ( b^{61, 20}_2 ∧ -b^{61, 20}_1 ∧  b^{61, 20}_0)
c  in CNF:
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨  b^{61, 20}_2
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_1
c     b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨  b^{61, 20}_0
c  in DIMACS:
 17627  17628  17629  1159  17630 0
 17627  17628  17629  1159 -17631 0
 17627  17628  17629  1159  17632 0

c  -1-1 --> -2
c    ( b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧  b^{61, 19}_0 ∧ -p_1159) -> ( b^{61, 20}_2 ∧  b^{61, 20}_1 ∧ -b^{61, 20}_0)
c  in CNF:
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨  b^{61, 20}_2
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨  b^{61, 20}_1
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨  p_1159 ∨ -b^{61, 20}_0
c  in DIMACS:
-17627  17628 -17629  1159  17630 0
-17627  17628 -17629  1159  17631 0
-17627  17628 -17629  1159 -17632 0

c  -2-1 --> break 
c    ( b^{61, 19}_2 ∧  b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧ -p_1159) -> break
c  in CNF:
c    -b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨  b^{61, 19}_0 ∨  p_1159 ∨ break
c  in DIMACS:
-17627 -17628  17629  1159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{61, 19}_2 ∧ -b^{61, 19}_1 ∧ -b^{61, 19}_0 ∧ true) 
c  in CNF:
c    -b^{61, 19}_2 ∨  b^{61, 19}_1 ∨  b^{61, 19}_0 ∨ false 
c  in DIMACS:
-17627  17628  17629  0

c  3 does not represent an automaton state.
c    -(-b^{61, 19}_2 ∧  b^{61, 19}_1 ∧  b^{61, 19}_0 ∧ true) 
c  in CNF:
c     b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ false 
c  in DIMACS:
 17627 -17628 -17629  0
c  -3 does not represent an automaton state.
c    -( b^{61, 19}_2 ∧  b^{61, 19}_1 ∧  b^{61, 19}_0 ∧ true) 
c  in CNF:
c    -b^{61, 19}_2 ∨ -b^{61, 19}_1 ∨ -b^{61, 19}_0 ∨ false 
c  in DIMACS:
-17627 -17628 -17629  0

c INIT for k = 62
c    -b^{62, 1}_2
c    -b^{62, 1}_1
c    -b^{62, 1}_0
c  in DIMACS:
-17633 0
-17634 0
-17635 0

c Transitions for k = 62
c i = 1
c  -2+1 --> -1
c    ( b^{62, 1}_2 ∧  b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧  p_62) -> ( b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0)
c  in CNF:
c    -b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨  b^{62, 2}_2
c    -b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_1
c    -b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨  b^{62, 2}_0
c  in DIMACS:
-17633 -17634  17635 -62  17636 0
-17633 -17634  17635 -62 -17637 0
-17633 -17634  17635 -62  17638 0

c  -1+1 --> 0
c    ( b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧  b^{62, 1}_0 ∧  p_62) -> (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧ -b^{62, 2}_0)
c  in CNF:
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_2
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_1
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_0
c  in DIMACS:
-17633  17634 -17635 -62 -17636 0
-17633  17634 -17635 -62 -17637 0
-17633  17634 -17635 -62 -17638 0

c  0+1 --> 1
c    (-b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧  p_62) -> (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0)
c  in CNF:
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_2
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_1
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨  b^{62, 2}_0
c  in DIMACS:
 17633  17634  17635 -62 -17636 0
 17633  17634  17635 -62 -17637 0
 17633  17634  17635 -62  17638 0

c  1+1 --> 2
c    (-b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧  b^{62, 1}_0 ∧  p_62) -> (-b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0)
c  in CNF:
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_2
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨  b^{62, 2}_1
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ -p_62 ∨ -b^{62, 2}_0
c  in DIMACS:
 17633  17634 -17635 -62 -17636 0
 17633  17634 -17635 -62  17637 0
 17633  17634 -17635 -62 -17638 0

c  2+1 --> break 
c    (-b^{62, 1}_2 ∧  b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧  p_62) -> break
c  in CNF:
c     b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ -p_62 ∨ break
c  in DIMACS:
 17633 -17634  17635 -62 1162 0


c  2-1 --> 1
c    (-b^{62, 1}_2 ∧  b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧ -p_62) -> (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0)
c  in CNF:
c     b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_2
c     b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_1
c     b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨  b^{62, 2}_0
c  in DIMACS:
 17633 -17634  17635  62 -17636 0
 17633 -17634  17635  62 -17637 0
 17633 -17634  17635  62  17638 0

c  1-1 --> 0
c    (-b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧  b^{62, 1}_0 ∧ -p_62) -> (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧ -b^{62, 2}_0)
c  in CNF:
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_2
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_1
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_0
c  in DIMACS:
 17633  17634 -17635  62 -17636 0
 17633  17634 -17635  62 -17637 0
 17633  17634 -17635  62 -17638 0

c  0-1 --> -1
c    (-b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧ -p_62) -> ( b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0)
c  in CNF:
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨  b^{62, 2}_2
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_1
c     b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨  b^{62, 2}_0
c  in DIMACS:
 17633  17634  17635  62  17636 0
 17633  17634  17635  62 -17637 0
 17633  17634  17635  62  17638 0

c  -1-1 --> -2
c    ( b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧  b^{62, 1}_0 ∧ -p_62) -> ( b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0)
c  in CNF:
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨  b^{62, 2}_2
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨  b^{62, 2}_1
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨  p_62 ∨ -b^{62, 2}_0
c  in DIMACS:
-17633  17634 -17635  62  17636 0
-17633  17634 -17635  62  17637 0
-17633  17634 -17635  62 -17638 0

c  -2-1 --> break 
c    ( b^{62, 1}_2 ∧  b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧ -p_62) -> break
c  in CNF:
c    -b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨  b^{62, 1}_0 ∨  p_62 ∨ break
c  in DIMACS:
-17633 -17634  17635  62 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 1}_2 ∧ -b^{62, 1}_1 ∧ -b^{62, 1}_0 ∧ true) 
c  in CNF:
c    -b^{62, 1}_2 ∨  b^{62, 1}_1 ∨  b^{62, 1}_0 ∨ false 
c  in DIMACS:
-17633  17634  17635  0

c  3 does not represent an automaton state.
c    -(-b^{62, 1}_2 ∧  b^{62, 1}_1 ∧  b^{62, 1}_0 ∧ true) 
c  in CNF:
c     b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ false 
c  in DIMACS:
 17633 -17634 -17635  0
c  -3 does not represent an automaton state.
c    -( b^{62, 1}_2 ∧  b^{62, 1}_1 ∧  b^{62, 1}_0 ∧ true) 
c  in CNF:
c    -b^{62, 1}_2 ∨ -b^{62, 1}_1 ∨ -b^{62, 1}_0 ∨ false 
c  in DIMACS:
-17633 -17634 -17635  0

c i = 2
c  -2+1 --> -1
c    ( b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧  p_124) -> ( b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0)
c  in CNF:
c    -b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨  b^{62, 3}_2
c    -b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_1
c    -b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨  b^{62, 3}_0
c  in DIMACS:
-17636 -17637  17638 -124  17639 0
-17636 -17637  17638 -124 -17640 0
-17636 -17637  17638 -124  17641 0

c  -1+1 --> 0
c    ( b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0 ∧  p_124) -> (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧ -b^{62, 3}_0)
c  in CNF:
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_2
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_1
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_0
c  in DIMACS:
-17636  17637 -17638 -124 -17639 0
-17636  17637 -17638 -124 -17640 0
-17636  17637 -17638 -124 -17641 0

c  0+1 --> 1
c    (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧  p_124) -> (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0)
c  in CNF:
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_2
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_1
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨  b^{62, 3}_0
c  in DIMACS:
 17636  17637  17638 -124 -17639 0
 17636  17637  17638 -124 -17640 0
 17636  17637  17638 -124  17641 0

c  1+1 --> 2
c    (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0 ∧  p_124) -> (-b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0)
c  in CNF:
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_2
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨  b^{62, 3}_1
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ -p_124 ∨ -b^{62, 3}_0
c  in DIMACS:
 17636  17637 -17638 -124 -17639 0
 17636  17637 -17638 -124  17640 0
 17636  17637 -17638 -124 -17641 0

c  2+1 --> break 
c    (-b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧  p_124) -> break
c  in CNF:
c     b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 17636 -17637  17638 -124 1162 0


c  2-1 --> 1
c    (-b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧ -p_124) -> (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0)
c  in CNF:
c     b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_2
c     b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_1
c     b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨  b^{62, 3}_0
c  in DIMACS:
 17636 -17637  17638  124 -17639 0
 17636 -17637  17638  124 -17640 0
 17636 -17637  17638  124  17641 0

c  1-1 --> 0
c    (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0 ∧ -p_124) -> (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧ -b^{62, 3}_0)
c  in CNF:
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_2
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_1
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_0
c  in DIMACS:
 17636  17637 -17638  124 -17639 0
 17636  17637 -17638  124 -17640 0
 17636  17637 -17638  124 -17641 0

c  0-1 --> -1
c    (-b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧ -p_124) -> ( b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0)
c  in CNF:
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨  b^{62, 3}_2
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_1
c     b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨  b^{62, 3}_0
c  in DIMACS:
 17636  17637  17638  124  17639 0
 17636  17637  17638  124 -17640 0
 17636  17637  17638  124  17641 0

c  -1-1 --> -2
c    ( b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧  b^{62, 2}_0 ∧ -p_124) -> ( b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0)
c  in CNF:
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨  b^{62, 3}_2
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨  b^{62, 3}_1
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨  p_124 ∨ -b^{62, 3}_0
c  in DIMACS:
-17636  17637 -17638  124  17639 0
-17636  17637 -17638  124  17640 0
-17636  17637 -17638  124 -17641 0

c  -2-1 --> break 
c    ( b^{62, 2}_2 ∧  b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨  b^{62, 2}_0 ∨  p_124 ∨ break
c  in DIMACS:
-17636 -17637  17638  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 2}_2 ∧ -b^{62, 2}_1 ∧ -b^{62, 2}_0 ∧ true) 
c  in CNF:
c    -b^{62, 2}_2 ∨  b^{62, 2}_1 ∨  b^{62, 2}_0 ∨ false 
c  in DIMACS:
-17636  17637  17638  0

c  3 does not represent an automaton state.
c    -(-b^{62, 2}_2 ∧  b^{62, 2}_1 ∧  b^{62, 2}_0 ∧ true) 
c  in CNF:
c     b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ false 
c  in DIMACS:
 17636 -17637 -17638  0
c  -3 does not represent an automaton state.
c    -( b^{62, 2}_2 ∧  b^{62, 2}_1 ∧  b^{62, 2}_0 ∧ true) 
c  in CNF:
c    -b^{62, 2}_2 ∨ -b^{62, 2}_1 ∨ -b^{62, 2}_0 ∨ false 
c  in DIMACS:
-17636 -17637 -17638  0

c i = 3
c  -2+1 --> -1
c    ( b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧  p_186) -> ( b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0)
c  in CNF:
c    -b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨  b^{62, 4}_2
c    -b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_1
c    -b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨  b^{62, 4}_0
c  in DIMACS:
-17639 -17640  17641 -186  17642 0
-17639 -17640  17641 -186 -17643 0
-17639 -17640  17641 -186  17644 0

c  -1+1 --> 0
c    ( b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0 ∧  p_186) -> (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧ -b^{62, 4}_0)
c  in CNF:
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_2
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_1
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_0
c  in DIMACS:
-17639  17640 -17641 -186 -17642 0
-17639  17640 -17641 -186 -17643 0
-17639  17640 -17641 -186 -17644 0

c  0+1 --> 1
c    (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧  p_186) -> (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0)
c  in CNF:
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_2
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_1
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨  b^{62, 4}_0
c  in DIMACS:
 17639  17640  17641 -186 -17642 0
 17639  17640  17641 -186 -17643 0
 17639  17640  17641 -186  17644 0

c  1+1 --> 2
c    (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0 ∧  p_186) -> (-b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0)
c  in CNF:
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_2
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨  b^{62, 4}_1
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ -p_186 ∨ -b^{62, 4}_0
c  in DIMACS:
 17639  17640 -17641 -186 -17642 0
 17639  17640 -17641 -186  17643 0
 17639  17640 -17641 -186 -17644 0

c  2+1 --> break 
c    (-b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧  p_186) -> break
c  in CNF:
c     b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 17639 -17640  17641 -186 1162 0


c  2-1 --> 1
c    (-b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧ -p_186) -> (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0)
c  in CNF:
c     b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_2
c     b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_1
c     b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨  b^{62, 4}_0
c  in DIMACS:
 17639 -17640  17641  186 -17642 0
 17639 -17640  17641  186 -17643 0
 17639 -17640  17641  186  17644 0

c  1-1 --> 0
c    (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0 ∧ -p_186) -> (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧ -b^{62, 4}_0)
c  in CNF:
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_2
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_1
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_0
c  in DIMACS:
 17639  17640 -17641  186 -17642 0
 17639  17640 -17641  186 -17643 0
 17639  17640 -17641  186 -17644 0

c  0-1 --> -1
c    (-b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧ -p_186) -> ( b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0)
c  in CNF:
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨  b^{62, 4}_2
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_1
c     b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨  b^{62, 4}_0
c  in DIMACS:
 17639  17640  17641  186  17642 0
 17639  17640  17641  186 -17643 0
 17639  17640  17641  186  17644 0

c  -1-1 --> -2
c    ( b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧  b^{62, 3}_0 ∧ -p_186) -> ( b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0)
c  in CNF:
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨  b^{62, 4}_2
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨  b^{62, 4}_1
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨  p_186 ∨ -b^{62, 4}_0
c  in DIMACS:
-17639  17640 -17641  186  17642 0
-17639  17640 -17641  186  17643 0
-17639  17640 -17641  186 -17644 0

c  -2-1 --> break 
c    ( b^{62, 3}_2 ∧  b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨  b^{62, 3}_0 ∨  p_186 ∨ break
c  in DIMACS:
-17639 -17640  17641  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 3}_2 ∧ -b^{62, 3}_1 ∧ -b^{62, 3}_0 ∧ true) 
c  in CNF:
c    -b^{62, 3}_2 ∨  b^{62, 3}_1 ∨  b^{62, 3}_0 ∨ false 
c  in DIMACS:
-17639  17640  17641  0

c  3 does not represent an automaton state.
c    -(-b^{62, 3}_2 ∧  b^{62, 3}_1 ∧  b^{62, 3}_0 ∧ true) 
c  in CNF:
c     b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ false 
c  in DIMACS:
 17639 -17640 -17641  0
c  -3 does not represent an automaton state.
c    -( b^{62, 3}_2 ∧  b^{62, 3}_1 ∧  b^{62, 3}_0 ∧ true) 
c  in CNF:
c    -b^{62, 3}_2 ∨ -b^{62, 3}_1 ∨ -b^{62, 3}_0 ∨ false 
c  in DIMACS:
-17639 -17640 -17641  0

c i = 4
c  -2+1 --> -1
c    ( b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧  p_248) -> ( b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0)
c  in CNF:
c    -b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨  b^{62, 5}_2
c    -b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_1
c    -b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨  b^{62, 5}_0
c  in DIMACS:
-17642 -17643  17644 -248  17645 0
-17642 -17643  17644 -248 -17646 0
-17642 -17643  17644 -248  17647 0

c  -1+1 --> 0
c    ( b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0 ∧  p_248) -> (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧ -b^{62, 5}_0)
c  in CNF:
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_2
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_1
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_0
c  in DIMACS:
-17642  17643 -17644 -248 -17645 0
-17642  17643 -17644 -248 -17646 0
-17642  17643 -17644 -248 -17647 0

c  0+1 --> 1
c    (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧  p_248) -> (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0)
c  in CNF:
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_2
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_1
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨  b^{62, 5}_0
c  in DIMACS:
 17642  17643  17644 -248 -17645 0
 17642  17643  17644 -248 -17646 0
 17642  17643  17644 -248  17647 0

c  1+1 --> 2
c    (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0 ∧  p_248) -> (-b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0)
c  in CNF:
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_2
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨  b^{62, 5}_1
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ -p_248 ∨ -b^{62, 5}_0
c  in DIMACS:
 17642  17643 -17644 -248 -17645 0
 17642  17643 -17644 -248  17646 0
 17642  17643 -17644 -248 -17647 0

c  2+1 --> break 
c    (-b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧  p_248) -> break
c  in CNF:
c     b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 17642 -17643  17644 -248 1162 0


c  2-1 --> 1
c    (-b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧ -p_248) -> (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0)
c  in CNF:
c     b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_2
c     b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_1
c     b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨  b^{62, 5}_0
c  in DIMACS:
 17642 -17643  17644  248 -17645 0
 17642 -17643  17644  248 -17646 0
 17642 -17643  17644  248  17647 0

c  1-1 --> 0
c    (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0 ∧ -p_248) -> (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧ -b^{62, 5}_0)
c  in CNF:
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_2
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_1
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_0
c  in DIMACS:
 17642  17643 -17644  248 -17645 0
 17642  17643 -17644  248 -17646 0
 17642  17643 -17644  248 -17647 0

c  0-1 --> -1
c    (-b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧ -p_248) -> ( b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0)
c  in CNF:
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨  b^{62, 5}_2
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_1
c     b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨  b^{62, 5}_0
c  in DIMACS:
 17642  17643  17644  248  17645 0
 17642  17643  17644  248 -17646 0
 17642  17643  17644  248  17647 0

c  -1-1 --> -2
c    ( b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧  b^{62, 4}_0 ∧ -p_248) -> ( b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0)
c  in CNF:
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨  b^{62, 5}_2
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨  b^{62, 5}_1
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨  p_248 ∨ -b^{62, 5}_0
c  in DIMACS:
-17642  17643 -17644  248  17645 0
-17642  17643 -17644  248  17646 0
-17642  17643 -17644  248 -17647 0

c  -2-1 --> break 
c    ( b^{62, 4}_2 ∧  b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨  b^{62, 4}_0 ∨  p_248 ∨ break
c  in DIMACS:
-17642 -17643  17644  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 4}_2 ∧ -b^{62, 4}_1 ∧ -b^{62, 4}_0 ∧ true) 
c  in CNF:
c    -b^{62, 4}_2 ∨  b^{62, 4}_1 ∨  b^{62, 4}_0 ∨ false 
c  in DIMACS:
-17642  17643  17644  0

c  3 does not represent an automaton state.
c    -(-b^{62, 4}_2 ∧  b^{62, 4}_1 ∧  b^{62, 4}_0 ∧ true) 
c  in CNF:
c     b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ false 
c  in DIMACS:
 17642 -17643 -17644  0
c  -3 does not represent an automaton state.
c    -( b^{62, 4}_2 ∧  b^{62, 4}_1 ∧  b^{62, 4}_0 ∧ true) 
c  in CNF:
c    -b^{62, 4}_2 ∨ -b^{62, 4}_1 ∨ -b^{62, 4}_0 ∨ false 
c  in DIMACS:
-17642 -17643 -17644  0

c i = 5
c  -2+1 --> -1
c    ( b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧  p_310) -> ( b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0)
c  in CNF:
c    -b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨  b^{62, 6}_2
c    -b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_1
c    -b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨  b^{62, 6}_0
c  in DIMACS:
-17645 -17646  17647 -310  17648 0
-17645 -17646  17647 -310 -17649 0
-17645 -17646  17647 -310  17650 0

c  -1+1 --> 0
c    ( b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0 ∧  p_310) -> (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧ -b^{62, 6}_0)
c  in CNF:
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_2
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_1
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_0
c  in DIMACS:
-17645  17646 -17647 -310 -17648 0
-17645  17646 -17647 -310 -17649 0
-17645  17646 -17647 -310 -17650 0

c  0+1 --> 1
c    (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧  p_310) -> (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0)
c  in CNF:
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_2
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_1
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨  b^{62, 6}_0
c  in DIMACS:
 17645  17646  17647 -310 -17648 0
 17645  17646  17647 -310 -17649 0
 17645  17646  17647 -310  17650 0

c  1+1 --> 2
c    (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0 ∧  p_310) -> (-b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0)
c  in CNF:
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_2
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨  b^{62, 6}_1
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ -p_310 ∨ -b^{62, 6}_0
c  in DIMACS:
 17645  17646 -17647 -310 -17648 0
 17645  17646 -17647 -310  17649 0
 17645  17646 -17647 -310 -17650 0

c  2+1 --> break 
c    (-b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧  p_310) -> break
c  in CNF:
c     b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 17645 -17646  17647 -310 1162 0


c  2-1 --> 1
c    (-b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧ -p_310) -> (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0)
c  in CNF:
c     b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_2
c     b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_1
c     b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨  b^{62, 6}_0
c  in DIMACS:
 17645 -17646  17647  310 -17648 0
 17645 -17646  17647  310 -17649 0
 17645 -17646  17647  310  17650 0

c  1-1 --> 0
c    (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0 ∧ -p_310) -> (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧ -b^{62, 6}_0)
c  in CNF:
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_2
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_1
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_0
c  in DIMACS:
 17645  17646 -17647  310 -17648 0
 17645  17646 -17647  310 -17649 0
 17645  17646 -17647  310 -17650 0

c  0-1 --> -1
c    (-b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧ -p_310) -> ( b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0)
c  in CNF:
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨  b^{62, 6}_2
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_1
c     b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨  b^{62, 6}_0
c  in DIMACS:
 17645  17646  17647  310  17648 0
 17645  17646  17647  310 -17649 0
 17645  17646  17647  310  17650 0

c  -1-1 --> -2
c    ( b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧  b^{62, 5}_0 ∧ -p_310) -> ( b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0)
c  in CNF:
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨  b^{62, 6}_2
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨  b^{62, 6}_1
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨  p_310 ∨ -b^{62, 6}_0
c  in DIMACS:
-17645  17646 -17647  310  17648 0
-17645  17646 -17647  310  17649 0
-17645  17646 -17647  310 -17650 0

c  -2-1 --> break 
c    ( b^{62, 5}_2 ∧  b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨  b^{62, 5}_0 ∨  p_310 ∨ break
c  in DIMACS:
-17645 -17646  17647  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 5}_2 ∧ -b^{62, 5}_1 ∧ -b^{62, 5}_0 ∧ true) 
c  in CNF:
c    -b^{62, 5}_2 ∨  b^{62, 5}_1 ∨  b^{62, 5}_0 ∨ false 
c  in DIMACS:
-17645  17646  17647  0

c  3 does not represent an automaton state.
c    -(-b^{62, 5}_2 ∧  b^{62, 5}_1 ∧  b^{62, 5}_0 ∧ true) 
c  in CNF:
c     b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ false 
c  in DIMACS:
 17645 -17646 -17647  0
c  -3 does not represent an automaton state.
c    -( b^{62, 5}_2 ∧  b^{62, 5}_1 ∧  b^{62, 5}_0 ∧ true) 
c  in CNF:
c    -b^{62, 5}_2 ∨ -b^{62, 5}_1 ∨ -b^{62, 5}_0 ∨ false 
c  in DIMACS:
-17645 -17646 -17647  0

c i = 6
c  -2+1 --> -1
c    ( b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧  p_372) -> ( b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0)
c  in CNF:
c    -b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨  b^{62, 7}_2
c    -b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_1
c    -b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨  b^{62, 7}_0
c  in DIMACS:
-17648 -17649  17650 -372  17651 0
-17648 -17649  17650 -372 -17652 0
-17648 -17649  17650 -372  17653 0

c  -1+1 --> 0
c    ( b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0 ∧  p_372) -> (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧ -b^{62, 7}_0)
c  in CNF:
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_2
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_1
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_0
c  in DIMACS:
-17648  17649 -17650 -372 -17651 0
-17648  17649 -17650 -372 -17652 0
-17648  17649 -17650 -372 -17653 0

c  0+1 --> 1
c    (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧  p_372) -> (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0)
c  in CNF:
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_2
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_1
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨  b^{62, 7}_0
c  in DIMACS:
 17648  17649  17650 -372 -17651 0
 17648  17649  17650 -372 -17652 0
 17648  17649  17650 -372  17653 0

c  1+1 --> 2
c    (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0 ∧  p_372) -> (-b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0)
c  in CNF:
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_2
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨  b^{62, 7}_1
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ -p_372 ∨ -b^{62, 7}_0
c  in DIMACS:
 17648  17649 -17650 -372 -17651 0
 17648  17649 -17650 -372  17652 0
 17648  17649 -17650 -372 -17653 0

c  2+1 --> break 
c    (-b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧  p_372) -> break
c  in CNF:
c     b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 17648 -17649  17650 -372 1162 0


c  2-1 --> 1
c    (-b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧ -p_372) -> (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0)
c  in CNF:
c     b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_2
c     b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_1
c     b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨  b^{62, 7}_0
c  in DIMACS:
 17648 -17649  17650  372 -17651 0
 17648 -17649  17650  372 -17652 0
 17648 -17649  17650  372  17653 0

c  1-1 --> 0
c    (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0 ∧ -p_372) -> (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧ -b^{62, 7}_0)
c  in CNF:
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_2
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_1
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_0
c  in DIMACS:
 17648  17649 -17650  372 -17651 0
 17648  17649 -17650  372 -17652 0
 17648  17649 -17650  372 -17653 0

c  0-1 --> -1
c    (-b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧ -p_372) -> ( b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0)
c  in CNF:
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨  b^{62, 7}_2
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_1
c     b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨  b^{62, 7}_0
c  in DIMACS:
 17648  17649  17650  372  17651 0
 17648  17649  17650  372 -17652 0
 17648  17649  17650  372  17653 0

c  -1-1 --> -2
c    ( b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧  b^{62, 6}_0 ∧ -p_372) -> ( b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0)
c  in CNF:
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨  b^{62, 7}_2
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨  b^{62, 7}_1
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨  p_372 ∨ -b^{62, 7}_0
c  in DIMACS:
-17648  17649 -17650  372  17651 0
-17648  17649 -17650  372  17652 0
-17648  17649 -17650  372 -17653 0

c  -2-1 --> break 
c    ( b^{62, 6}_2 ∧  b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨  b^{62, 6}_0 ∨  p_372 ∨ break
c  in DIMACS:
-17648 -17649  17650  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 6}_2 ∧ -b^{62, 6}_1 ∧ -b^{62, 6}_0 ∧ true) 
c  in CNF:
c    -b^{62, 6}_2 ∨  b^{62, 6}_1 ∨  b^{62, 6}_0 ∨ false 
c  in DIMACS:
-17648  17649  17650  0

c  3 does not represent an automaton state.
c    -(-b^{62, 6}_2 ∧  b^{62, 6}_1 ∧  b^{62, 6}_0 ∧ true) 
c  in CNF:
c     b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ false 
c  in DIMACS:
 17648 -17649 -17650  0
c  -3 does not represent an automaton state.
c    -( b^{62, 6}_2 ∧  b^{62, 6}_1 ∧  b^{62, 6}_0 ∧ true) 
c  in CNF:
c    -b^{62, 6}_2 ∨ -b^{62, 6}_1 ∨ -b^{62, 6}_0 ∨ false 
c  in DIMACS:
-17648 -17649 -17650  0

c i = 7
c  -2+1 --> -1
c    ( b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧  p_434) -> ( b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0)
c  in CNF:
c    -b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨  b^{62, 8}_2
c    -b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_1
c    -b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨  b^{62, 8}_0
c  in DIMACS:
-17651 -17652  17653 -434  17654 0
-17651 -17652  17653 -434 -17655 0
-17651 -17652  17653 -434  17656 0

c  -1+1 --> 0
c    ( b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0 ∧  p_434) -> (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧ -b^{62, 8}_0)
c  in CNF:
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_2
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_1
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_0
c  in DIMACS:
-17651  17652 -17653 -434 -17654 0
-17651  17652 -17653 -434 -17655 0
-17651  17652 -17653 -434 -17656 0

c  0+1 --> 1
c    (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧  p_434) -> (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0)
c  in CNF:
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_2
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_1
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨  b^{62, 8}_0
c  in DIMACS:
 17651  17652  17653 -434 -17654 0
 17651  17652  17653 -434 -17655 0
 17651  17652  17653 -434  17656 0

c  1+1 --> 2
c    (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0 ∧  p_434) -> (-b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0)
c  in CNF:
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_2
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨  b^{62, 8}_1
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ -p_434 ∨ -b^{62, 8}_0
c  in DIMACS:
 17651  17652 -17653 -434 -17654 0
 17651  17652 -17653 -434  17655 0
 17651  17652 -17653 -434 -17656 0

c  2+1 --> break 
c    (-b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧  p_434) -> break
c  in CNF:
c     b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 17651 -17652  17653 -434 1162 0


c  2-1 --> 1
c    (-b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧ -p_434) -> (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0)
c  in CNF:
c     b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_2
c     b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_1
c     b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨  b^{62, 8}_0
c  in DIMACS:
 17651 -17652  17653  434 -17654 0
 17651 -17652  17653  434 -17655 0
 17651 -17652  17653  434  17656 0

c  1-1 --> 0
c    (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0 ∧ -p_434) -> (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧ -b^{62, 8}_0)
c  in CNF:
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_2
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_1
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_0
c  in DIMACS:
 17651  17652 -17653  434 -17654 0
 17651  17652 -17653  434 -17655 0
 17651  17652 -17653  434 -17656 0

c  0-1 --> -1
c    (-b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧ -p_434) -> ( b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0)
c  in CNF:
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨  b^{62, 8}_2
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_1
c     b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨  b^{62, 8}_0
c  in DIMACS:
 17651  17652  17653  434  17654 0
 17651  17652  17653  434 -17655 0
 17651  17652  17653  434  17656 0

c  -1-1 --> -2
c    ( b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧  b^{62, 7}_0 ∧ -p_434) -> ( b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0)
c  in CNF:
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨  b^{62, 8}_2
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨  b^{62, 8}_1
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨  p_434 ∨ -b^{62, 8}_0
c  in DIMACS:
-17651  17652 -17653  434  17654 0
-17651  17652 -17653  434  17655 0
-17651  17652 -17653  434 -17656 0

c  -2-1 --> break 
c    ( b^{62, 7}_2 ∧  b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨  b^{62, 7}_0 ∨  p_434 ∨ break
c  in DIMACS:
-17651 -17652  17653  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 7}_2 ∧ -b^{62, 7}_1 ∧ -b^{62, 7}_0 ∧ true) 
c  in CNF:
c    -b^{62, 7}_2 ∨  b^{62, 7}_1 ∨  b^{62, 7}_0 ∨ false 
c  in DIMACS:
-17651  17652  17653  0

c  3 does not represent an automaton state.
c    -(-b^{62, 7}_2 ∧  b^{62, 7}_1 ∧  b^{62, 7}_0 ∧ true) 
c  in CNF:
c     b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ false 
c  in DIMACS:
 17651 -17652 -17653  0
c  -3 does not represent an automaton state.
c    -( b^{62, 7}_2 ∧  b^{62, 7}_1 ∧  b^{62, 7}_0 ∧ true) 
c  in CNF:
c    -b^{62, 7}_2 ∨ -b^{62, 7}_1 ∨ -b^{62, 7}_0 ∨ false 
c  in DIMACS:
-17651 -17652 -17653  0

c i = 8
c  -2+1 --> -1
c    ( b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧  p_496) -> ( b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0)
c  in CNF:
c    -b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨  b^{62, 9}_2
c    -b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_1
c    -b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨  b^{62, 9}_0
c  in DIMACS:
-17654 -17655  17656 -496  17657 0
-17654 -17655  17656 -496 -17658 0
-17654 -17655  17656 -496  17659 0

c  -1+1 --> 0
c    ( b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0 ∧  p_496) -> (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧ -b^{62, 9}_0)
c  in CNF:
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_2
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_1
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_0
c  in DIMACS:
-17654  17655 -17656 -496 -17657 0
-17654  17655 -17656 -496 -17658 0
-17654  17655 -17656 -496 -17659 0

c  0+1 --> 1
c    (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧  p_496) -> (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0)
c  in CNF:
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_2
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_1
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨  b^{62, 9}_0
c  in DIMACS:
 17654  17655  17656 -496 -17657 0
 17654  17655  17656 -496 -17658 0
 17654  17655  17656 -496  17659 0

c  1+1 --> 2
c    (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0 ∧  p_496) -> (-b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0)
c  in CNF:
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_2
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨  b^{62, 9}_1
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ -p_496 ∨ -b^{62, 9}_0
c  in DIMACS:
 17654  17655 -17656 -496 -17657 0
 17654  17655 -17656 -496  17658 0
 17654  17655 -17656 -496 -17659 0

c  2+1 --> break 
c    (-b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧  p_496) -> break
c  in CNF:
c     b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 17654 -17655  17656 -496 1162 0


c  2-1 --> 1
c    (-b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧ -p_496) -> (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0)
c  in CNF:
c     b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_2
c     b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_1
c     b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨  b^{62, 9}_0
c  in DIMACS:
 17654 -17655  17656  496 -17657 0
 17654 -17655  17656  496 -17658 0
 17654 -17655  17656  496  17659 0

c  1-1 --> 0
c    (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0 ∧ -p_496) -> (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧ -b^{62, 9}_0)
c  in CNF:
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_2
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_1
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_0
c  in DIMACS:
 17654  17655 -17656  496 -17657 0
 17654  17655 -17656  496 -17658 0
 17654  17655 -17656  496 -17659 0

c  0-1 --> -1
c    (-b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧ -p_496) -> ( b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0)
c  in CNF:
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨  b^{62, 9}_2
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_1
c     b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨  b^{62, 9}_0
c  in DIMACS:
 17654  17655  17656  496  17657 0
 17654  17655  17656  496 -17658 0
 17654  17655  17656  496  17659 0

c  -1-1 --> -2
c    ( b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧  b^{62, 8}_0 ∧ -p_496) -> ( b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0)
c  in CNF:
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨  b^{62, 9}_2
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨  b^{62, 9}_1
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨  p_496 ∨ -b^{62, 9}_0
c  in DIMACS:
-17654  17655 -17656  496  17657 0
-17654  17655 -17656  496  17658 0
-17654  17655 -17656  496 -17659 0

c  -2-1 --> break 
c    ( b^{62, 8}_2 ∧  b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨  b^{62, 8}_0 ∨  p_496 ∨ break
c  in DIMACS:
-17654 -17655  17656  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 8}_2 ∧ -b^{62, 8}_1 ∧ -b^{62, 8}_0 ∧ true) 
c  in CNF:
c    -b^{62, 8}_2 ∨  b^{62, 8}_1 ∨  b^{62, 8}_0 ∨ false 
c  in DIMACS:
-17654  17655  17656  0

c  3 does not represent an automaton state.
c    -(-b^{62, 8}_2 ∧  b^{62, 8}_1 ∧  b^{62, 8}_0 ∧ true) 
c  in CNF:
c     b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ false 
c  in DIMACS:
 17654 -17655 -17656  0
c  -3 does not represent an automaton state.
c    -( b^{62, 8}_2 ∧  b^{62, 8}_1 ∧  b^{62, 8}_0 ∧ true) 
c  in CNF:
c    -b^{62, 8}_2 ∨ -b^{62, 8}_1 ∨ -b^{62, 8}_0 ∨ false 
c  in DIMACS:
-17654 -17655 -17656  0

c i = 9
c  -2+1 --> -1
c    ( b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧  p_558) -> ( b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0)
c  in CNF:
c    -b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨  b^{62, 10}_2
c    -b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_1
c    -b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨  b^{62, 10}_0
c  in DIMACS:
-17657 -17658  17659 -558  17660 0
-17657 -17658  17659 -558 -17661 0
-17657 -17658  17659 -558  17662 0

c  -1+1 --> 0
c    ( b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0 ∧  p_558) -> (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧ -b^{62, 10}_0)
c  in CNF:
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_2
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_1
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_0
c  in DIMACS:
-17657  17658 -17659 -558 -17660 0
-17657  17658 -17659 -558 -17661 0
-17657  17658 -17659 -558 -17662 0

c  0+1 --> 1
c    (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧  p_558) -> (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0)
c  in CNF:
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_2
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_1
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨  b^{62, 10}_0
c  in DIMACS:
 17657  17658  17659 -558 -17660 0
 17657  17658  17659 -558 -17661 0
 17657  17658  17659 -558  17662 0

c  1+1 --> 2
c    (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0 ∧  p_558) -> (-b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0)
c  in CNF:
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_2
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨  b^{62, 10}_1
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ -p_558 ∨ -b^{62, 10}_0
c  in DIMACS:
 17657  17658 -17659 -558 -17660 0
 17657  17658 -17659 -558  17661 0
 17657  17658 -17659 -558 -17662 0

c  2+1 --> break 
c    (-b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧  p_558) -> break
c  in CNF:
c     b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 17657 -17658  17659 -558 1162 0


c  2-1 --> 1
c    (-b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧ -p_558) -> (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0)
c  in CNF:
c     b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_2
c     b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_1
c     b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨  b^{62, 10}_0
c  in DIMACS:
 17657 -17658  17659  558 -17660 0
 17657 -17658  17659  558 -17661 0
 17657 -17658  17659  558  17662 0

c  1-1 --> 0
c    (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0 ∧ -p_558) -> (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧ -b^{62, 10}_0)
c  in CNF:
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_2
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_1
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_0
c  in DIMACS:
 17657  17658 -17659  558 -17660 0
 17657  17658 -17659  558 -17661 0
 17657  17658 -17659  558 -17662 0

c  0-1 --> -1
c    (-b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧ -p_558) -> ( b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0)
c  in CNF:
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨  b^{62, 10}_2
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_1
c     b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨  b^{62, 10}_0
c  in DIMACS:
 17657  17658  17659  558  17660 0
 17657  17658  17659  558 -17661 0
 17657  17658  17659  558  17662 0

c  -1-1 --> -2
c    ( b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧  b^{62, 9}_0 ∧ -p_558) -> ( b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0)
c  in CNF:
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨  b^{62, 10}_2
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨  b^{62, 10}_1
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨  p_558 ∨ -b^{62, 10}_0
c  in DIMACS:
-17657  17658 -17659  558  17660 0
-17657  17658 -17659  558  17661 0
-17657  17658 -17659  558 -17662 0

c  -2-1 --> break 
c    ( b^{62, 9}_2 ∧  b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨  b^{62, 9}_0 ∨  p_558 ∨ break
c  in DIMACS:
-17657 -17658  17659  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 9}_2 ∧ -b^{62, 9}_1 ∧ -b^{62, 9}_0 ∧ true) 
c  in CNF:
c    -b^{62, 9}_2 ∨  b^{62, 9}_1 ∨  b^{62, 9}_0 ∨ false 
c  in DIMACS:
-17657  17658  17659  0

c  3 does not represent an automaton state.
c    -(-b^{62, 9}_2 ∧  b^{62, 9}_1 ∧  b^{62, 9}_0 ∧ true) 
c  in CNF:
c     b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ false 
c  in DIMACS:
 17657 -17658 -17659  0
c  -3 does not represent an automaton state.
c    -( b^{62, 9}_2 ∧  b^{62, 9}_1 ∧  b^{62, 9}_0 ∧ true) 
c  in CNF:
c    -b^{62, 9}_2 ∨ -b^{62, 9}_1 ∨ -b^{62, 9}_0 ∨ false 
c  in DIMACS:
-17657 -17658 -17659  0

c i = 10
c  -2+1 --> -1
c    ( b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧  p_620) -> ( b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0)
c  in CNF:
c    -b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨  b^{62, 11}_2
c    -b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_1
c    -b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨  b^{62, 11}_0
c  in DIMACS:
-17660 -17661  17662 -620  17663 0
-17660 -17661  17662 -620 -17664 0
-17660 -17661  17662 -620  17665 0

c  -1+1 --> 0
c    ( b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0 ∧  p_620) -> (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧ -b^{62, 11}_0)
c  in CNF:
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_2
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_1
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_0
c  in DIMACS:
-17660  17661 -17662 -620 -17663 0
-17660  17661 -17662 -620 -17664 0
-17660  17661 -17662 -620 -17665 0

c  0+1 --> 1
c    (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧  p_620) -> (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0)
c  in CNF:
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_2
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_1
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨  b^{62, 11}_0
c  in DIMACS:
 17660  17661  17662 -620 -17663 0
 17660  17661  17662 -620 -17664 0
 17660  17661  17662 -620  17665 0

c  1+1 --> 2
c    (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0 ∧  p_620) -> (-b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0)
c  in CNF:
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_2
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨  b^{62, 11}_1
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ -p_620 ∨ -b^{62, 11}_0
c  in DIMACS:
 17660  17661 -17662 -620 -17663 0
 17660  17661 -17662 -620  17664 0
 17660  17661 -17662 -620 -17665 0

c  2+1 --> break 
c    (-b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧  p_620) -> break
c  in CNF:
c     b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 17660 -17661  17662 -620 1162 0


c  2-1 --> 1
c    (-b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧ -p_620) -> (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0)
c  in CNF:
c     b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_2
c     b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_1
c     b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨  b^{62, 11}_0
c  in DIMACS:
 17660 -17661  17662  620 -17663 0
 17660 -17661  17662  620 -17664 0
 17660 -17661  17662  620  17665 0

c  1-1 --> 0
c    (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0 ∧ -p_620) -> (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧ -b^{62, 11}_0)
c  in CNF:
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_2
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_1
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_0
c  in DIMACS:
 17660  17661 -17662  620 -17663 0
 17660  17661 -17662  620 -17664 0
 17660  17661 -17662  620 -17665 0

c  0-1 --> -1
c    (-b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧ -p_620) -> ( b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0)
c  in CNF:
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨  b^{62, 11}_2
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_1
c     b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨  b^{62, 11}_0
c  in DIMACS:
 17660  17661  17662  620  17663 0
 17660  17661  17662  620 -17664 0
 17660  17661  17662  620  17665 0

c  -1-1 --> -2
c    ( b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧  b^{62, 10}_0 ∧ -p_620) -> ( b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0)
c  in CNF:
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨  b^{62, 11}_2
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨  b^{62, 11}_1
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨  p_620 ∨ -b^{62, 11}_0
c  in DIMACS:
-17660  17661 -17662  620  17663 0
-17660  17661 -17662  620  17664 0
-17660  17661 -17662  620 -17665 0

c  -2-1 --> break 
c    ( b^{62, 10}_2 ∧  b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨  b^{62, 10}_0 ∨  p_620 ∨ break
c  in DIMACS:
-17660 -17661  17662  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 10}_2 ∧ -b^{62, 10}_1 ∧ -b^{62, 10}_0 ∧ true) 
c  in CNF:
c    -b^{62, 10}_2 ∨  b^{62, 10}_1 ∨  b^{62, 10}_0 ∨ false 
c  in DIMACS:
-17660  17661  17662  0

c  3 does not represent an automaton state.
c    -(-b^{62, 10}_2 ∧  b^{62, 10}_1 ∧  b^{62, 10}_0 ∧ true) 
c  in CNF:
c     b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ false 
c  in DIMACS:
 17660 -17661 -17662  0
c  -3 does not represent an automaton state.
c    -( b^{62, 10}_2 ∧  b^{62, 10}_1 ∧  b^{62, 10}_0 ∧ true) 
c  in CNF:
c    -b^{62, 10}_2 ∨ -b^{62, 10}_1 ∨ -b^{62, 10}_0 ∨ false 
c  in DIMACS:
-17660 -17661 -17662  0

c i = 11
c  -2+1 --> -1
c    ( b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧  p_682) -> ( b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0)
c  in CNF:
c    -b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨  b^{62, 12}_2
c    -b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_1
c    -b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨  b^{62, 12}_0
c  in DIMACS:
-17663 -17664  17665 -682  17666 0
-17663 -17664  17665 -682 -17667 0
-17663 -17664  17665 -682  17668 0

c  -1+1 --> 0
c    ( b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0 ∧  p_682) -> (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧ -b^{62, 12}_0)
c  in CNF:
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_2
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_1
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_0
c  in DIMACS:
-17663  17664 -17665 -682 -17666 0
-17663  17664 -17665 -682 -17667 0
-17663  17664 -17665 -682 -17668 0

c  0+1 --> 1
c    (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧  p_682) -> (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0)
c  in CNF:
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_2
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_1
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨  b^{62, 12}_0
c  in DIMACS:
 17663  17664  17665 -682 -17666 0
 17663  17664  17665 -682 -17667 0
 17663  17664  17665 -682  17668 0

c  1+1 --> 2
c    (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0 ∧  p_682) -> (-b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0)
c  in CNF:
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_2
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨  b^{62, 12}_1
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ -p_682 ∨ -b^{62, 12}_0
c  in DIMACS:
 17663  17664 -17665 -682 -17666 0
 17663  17664 -17665 -682  17667 0
 17663  17664 -17665 -682 -17668 0

c  2+1 --> break 
c    (-b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧  p_682) -> break
c  in CNF:
c     b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 17663 -17664  17665 -682 1162 0


c  2-1 --> 1
c    (-b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧ -p_682) -> (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0)
c  in CNF:
c     b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_2
c     b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_1
c     b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨  b^{62, 12}_0
c  in DIMACS:
 17663 -17664  17665  682 -17666 0
 17663 -17664  17665  682 -17667 0
 17663 -17664  17665  682  17668 0

c  1-1 --> 0
c    (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0 ∧ -p_682) -> (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧ -b^{62, 12}_0)
c  in CNF:
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_2
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_1
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_0
c  in DIMACS:
 17663  17664 -17665  682 -17666 0
 17663  17664 -17665  682 -17667 0
 17663  17664 -17665  682 -17668 0

c  0-1 --> -1
c    (-b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧ -p_682) -> ( b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0)
c  in CNF:
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨  b^{62, 12}_2
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_1
c     b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨  b^{62, 12}_0
c  in DIMACS:
 17663  17664  17665  682  17666 0
 17663  17664  17665  682 -17667 0
 17663  17664  17665  682  17668 0

c  -1-1 --> -2
c    ( b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧  b^{62, 11}_0 ∧ -p_682) -> ( b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0)
c  in CNF:
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨  b^{62, 12}_2
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨  b^{62, 12}_1
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨  p_682 ∨ -b^{62, 12}_0
c  in DIMACS:
-17663  17664 -17665  682  17666 0
-17663  17664 -17665  682  17667 0
-17663  17664 -17665  682 -17668 0

c  -2-1 --> break 
c    ( b^{62, 11}_2 ∧  b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨  b^{62, 11}_0 ∨  p_682 ∨ break
c  in DIMACS:
-17663 -17664  17665  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 11}_2 ∧ -b^{62, 11}_1 ∧ -b^{62, 11}_0 ∧ true) 
c  in CNF:
c    -b^{62, 11}_2 ∨  b^{62, 11}_1 ∨  b^{62, 11}_0 ∨ false 
c  in DIMACS:
-17663  17664  17665  0

c  3 does not represent an automaton state.
c    -(-b^{62, 11}_2 ∧  b^{62, 11}_1 ∧  b^{62, 11}_0 ∧ true) 
c  in CNF:
c     b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ false 
c  in DIMACS:
 17663 -17664 -17665  0
c  -3 does not represent an automaton state.
c    -( b^{62, 11}_2 ∧  b^{62, 11}_1 ∧  b^{62, 11}_0 ∧ true) 
c  in CNF:
c    -b^{62, 11}_2 ∨ -b^{62, 11}_1 ∨ -b^{62, 11}_0 ∨ false 
c  in DIMACS:
-17663 -17664 -17665  0

c i = 12
c  -2+1 --> -1
c    ( b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧  p_744) -> ( b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0)
c  in CNF:
c    -b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨  b^{62, 13}_2
c    -b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_1
c    -b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨  b^{62, 13}_0
c  in DIMACS:
-17666 -17667  17668 -744  17669 0
-17666 -17667  17668 -744 -17670 0
-17666 -17667  17668 -744  17671 0

c  -1+1 --> 0
c    ( b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0 ∧  p_744) -> (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧ -b^{62, 13}_0)
c  in CNF:
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_2
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_1
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_0
c  in DIMACS:
-17666  17667 -17668 -744 -17669 0
-17666  17667 -17668 -744 -17670 0
-17666  17667 -17668 -744 -17671 0

c  0+1 --> 1
c    (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧  p_744) -> (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0)
c  in CNF:
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_2
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_1
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨  b^{62, 13}_0
c  in DIMACS:
 17666  17667  17668 -744 -17669 0
 17666  17667  17668 -744 -17670 0
 17666  17667  17668 -744  17671 0

c  1+1 --> 2
c    (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0 ∧  p_744) -> (-b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0)
c  in CNF:
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_2
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨  b^{62, 13}_1
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ -p_744 ∨ -b^{62, 13}_0
c  in DIMACS:
 17666  17667 -17668 -744 -17669 0
 17666  17667 -17668 -744  17670 0
 17666  17667 -17668 -744 -17671 0

c  2+1 --> break 
c    (-b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧  p_744) -> break
c  in CNF:
c     b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 17666 -17667  17668 -744 1162 0


c  2-1 --> 1
c    (-b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧ -p_744) -> (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0)
c  in CNF:
c     b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_2
c     b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_1
c     b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨  b^{62, 13}_0
c  in DIMACS:
 17666 -17667  17668  744 -17669 0
 17666 -17667  17668  744 -17670 0
 17666 -17667  17668  744  17671 0

c  1-1 --> 0
c    (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0 ∧ -p_744) -> (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧ -b^{62, 13}_0)
c  in CNF:
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_2
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_1
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_0
c  in DIMACS:
 17666  17667 -17668  744 -17669 0
 17666  17667 -17668  744 -17670 0
 17666  17667 -17668  744 -17671 0

c  0-1 --> -1
c    (-b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧ -p_744) -> ( b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0)
c  in CNF:
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨  b^{62, 13}_2
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_1
c     b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨  b^{62, 13}_0
c  in DIMACS:
 17666  17667  17668  744  17669 0
 17666  17667  17668  744 -17670 0
 17666  17667  17668  744  17671 0

c  -1-1 --> -2
c    ( b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧  b^{62, 12}_0 ∧ -p_744) -> ( b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0)
c  in CNF:
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨  b^{62, 13}_2
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨  b^{62, 13}_1
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨  p_744 ∨ -b^{62, 13}_0
c  in DIMACS:
-17666  17667 -17668  744  17669 0
-17666  17667 -17668  744  17670 0
-17666  17667 -17668  744 -17671 0

c  -2-1 --> break 
c    ( b^{62, 12}_2 ∧  b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨  b^{62, 12}_0 ∨  p_744 ∨ break
c  in DIMACS:
-17666 -17667  17668  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 12}_2 ∧ -b^{62, 12}_1 ∧ -b^{62, 12}_0 ∧ true) 
c  in CNF:
c    -b^{62, 12}_2 ∨  b^{62, 12}_1 ∨  b^{62, 12}_0 ∨ false 
c  in DIMACS:
-17666  17667  17668  0

c  3 does not represent an automaton state.
c    -(-b^{62, 12}_2 ∧  b^{62, 12}_1 ∧  b^{62, 12}_0 ∧ true) 
c  in CNF:
c     b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ false 
c  in DIMACS:
 17666 -17667 -17668  0
c  -3 does not represent an automaton state.
c    -( b^{62, 12}_2 ∧  b^{62, 12}_1 ∧  b^{62, 12}_0 ∧ true) 
c  in CNF:
c    -b^{62, 12}_2 ∨ -b^{62, 12}_1 ∨ -b^{62, 12}_0 ∨ false 
c  in DIMACS:
-17666 -17667 -17668  0

c i = 13
c  -2+1 --> -1
c    ( b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧  p_806) -> ( b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0)
c  in CNF:
c    -b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨  b^{62, 14}_2
c    -b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_1
c    -b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨  b^{62, 14}_0
c  in DIMACS:
-17669 -17670  17671 -806  17672 0
-17669 -17670  17671 -806 -17673 0
-17669 -17670  17671 -806  17674 0

c  -1+1 --> 0
c    ( b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0 ∧  p_806) -> (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧ -b^{62, 14}_0)
c  in CNF:
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_2
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_1
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_0
c  in DIMACS:
-17669  17670 -17671 -806 -17672 0
-17669  17670 -17671 -806 -17673 0
-17669  17670 -17671 -806 -17674 0

c  0+1 --> 1
c    (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧  p_806) -> (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0)
c  in CNF:
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_2
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_1
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨  b^{62, 14}_0
c  in DIMACS:
 17669  17670  17671 -806 -17672 0
 17669  17670  17671 -806 -17673 0
 17669  17670  17671 -806  17674 0

c  1+1 --> 2
c    (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0 ∧  p_806) -> (-b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0)
c  in CNF:
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_2
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨  b^{62, 14}_1
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ -p_806 ∨ -b^{62, 14}_0
c  in DIMACS:
 17669  17670 -17671 -806 -17672 0
 17669  17670 -17671 -806  17673 0
 17669  17670 -17671 -806 -17674 0

c  2+1 --> break 
c    (-b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧  p_806) -> break
c  in CNF:
c     b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ -p_806 ∨ break
c  in DIMACS:
 17669 -17670  17671 -806 1162 0


c  2-1 --> 1
c    (-b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧ -p_806) -> (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0)
c  in CNF:
c     b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_2
c     b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_1
c     b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨  b^{62, 14}_0
c  in DIMACS:
 17669 -17670  17671  806 -17672 0
 17669 -17670  17671  806 -17673 0
 17669 -17670  17671  806  17674 0

c  1-1 --> 0
c    (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0 ∧ -p_806) -> (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧ -b^{62, 14}_0)
c  in CNF:
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_2
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_1
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_0
c  in DIMACS:
 17669  17670 -17671  806 -17672 0
 17669  17670 -17671  806 -17673 0
 17669  17670 -17671  806 -17674 0

c  0-1 --> -1
c    (-b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧ -p_806) -> ( b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0)
c  in CNF:
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨  b^{62, 14}_2
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_1
c     b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨  b^{62, 14}_0
c  in DIMACS:
 17669  17670  17671  806  17672 0
 17669  17670  17671  806 -17673 0
 17669  17670  17671  806  17674 0

c  -1-1 --> -2
c    ( b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧  b^{62, 13}_0 ∧ -p_806) -> ( b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0)
c  in CNF:
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨  b^{62, 14}_2
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨  b^{62, 14}_1
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨  p_806 ∨ -b^{62, 14}_0
c  in DIMACS:
-17669  17670 -17671  806  17672 0
-17669  17670 -17671  806  17673 0
-17669  17670 -17671  806 -17674 0

c  -2-1 --> break 
c    ( b^{62, 13}_2 ∧  b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧ -p_806) -> break
c  in CNF:
c    -b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨  b^{62, 13}_0 ∨  p_806 ∨ break
c  in DIMACS:
-17669 -17670  17671  806 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 13}_2 ∧ -b^{62, 13}_1 ∧ -b^{62, 13}_0 ∧ true) 
c  in CNF:
c    -b^{62, 13}_2 ∨  b^{62, 13}_1 ∨  b^{62, 13}_0 ∨ false 
c  in DIMACS:
-17669  17670  17671  0

c  3 does not represent an automaton state.
c    -(-b^{62, 13}_2 ∧  b^{62, 13}_1 ∧  b^{62, 13}_0 ∧ true) 
c  in CNF:
c     b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ false 
c  in DIMACS:
 17669 -17670 -17671  0
c  -3 does not represent an automaton state.
c    -( b^{62, 13}_2 ∧  b^{62, 13}_1 ∧  b^{62, 13}_0 ∧ true) 
c  in CNF:
c    -b^{62, 13}_2 ∨ -b^{62, 13}_1 ∨ -b^{62, 13}_0 ∨ false 
c  in DIMACS:
-17669 -17670 -17671  0

c i = 14
c  -2+1 --> -1
c    ( b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧  p_868) -> ( b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0)
c  in CNF:
c    -b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨  b^{62, 15}_2
c    -b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_1
c    -b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨  b^{62, 15}_0
c  in DIMACS:
-17672 -17673  17674 -868  17675 0
-17672 -17673  17674 -868 -17676 0
-17672 -17673  17674 -868  17677 0

c  -1+1 --> 0
c    ( b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0 ∧  p_868) -> (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧ -b^{62, 15}_0)
c  in CNF:
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_2
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_1
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_0
c  in DIMACS:
-17672  17673 -17674 -868 -17675 0
-17672  17673 -17674 -868 -17676 0
-17672  17673 -17674 -868 -17677 0

c  0+1 --> 1
c    (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧  p_868) -> (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0)
c  in CNF:
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_2
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_1
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨  b^{62, 15}_0
c  in DIMACS:
 17672  17673  17674 -868 -17675 0
 17672  17673  17674 -868 -17676 0
 17672  17673  17674 -868  17677 0

c  1+1 --> 2
c    (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0 ∧  p_868) -> (-b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0)
c  in CNF:
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_2
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨  b^{62, 15}_1
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ -p_868 ∨ -b^{62, 15}_0
c  in DIMACS:
 17672  17673 -17674 -868 -17675 0
 17672  17673 -17674 -868  17676 0
 17672  17673 -17674 -868 -17677 0

c  2+1 --> break 
c    (-b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧  p_868) -> break
c  in CNF:
c     b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 17672 -17673  17674 -868 1162 0


c  2-1 --> 1
c    (-b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧ -p_868) -> (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0)
c  in CNF:
c     b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_2
c     b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_1
c     b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨  b^{62, 15}_0
c  in DIMACS:
 17672 -17673  17674  868 -17675 0
 17672 -17673  17674  868 -17676 0
 17672 -17673  17674  868  17677 0

c  1-1 --> 0
c    (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0 ∧ -p_868) -> (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧ -b^{62, 15}_0)
c  in CNF:
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_2
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_1
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_0
c  in DIMACS:
 17672  17673 -17674  868 -17675 0
 17672  17673 -17674  868 -17676 0
 17672  17673 -17674  868 -17677 0

c  0-1 --> -1
c    (-b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧ -p_868) -> ( b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0)
c  in CNF:
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨  b^{62, 15}_2
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_1
c     b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨  b^{62, 15}_0
c  in DIMACS:
 17672  17673  17674  868  17675 0
 17672  17673  17674  868 -17676 0
 17672  17673  17674  868  17677 0

c  -1-1 --> -2
c    ( b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧  b^{62, 14}_0 ∧ -p_868) -> ( b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0)
c  in CNF:
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨  b^{62, 15}_2
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨  b^{62, 15}_1
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨  p_868 ∨ -b^{62, 15}_0
c  in DIMACS:
-17672  17673 -17674  868  17675 0
-17672  17673 -17674  868  17676 0
-17672  17673 -17674  868 -17677 0

c  -2-1 --> break 
c    ( b^{62, 14}_2 ∧  b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨  b^{62, 14}_0 ∨  p_868 ∨ break
c  in DIMACS:
-17672 -17673  17674  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 14}_2 ∧ -b^{62, 14}_1 ∧ -b^{62, 14}_0 ∧ true) 
c  in CNF:
c    -b^{62, 14}_2 ∨  b^{62, 14}_1 ∨  b^{62, 14}_0 ∨ false 
c  in DIMACS:
-17672  17673  17674  0

c  3 does not represent an automaton state.
c    -(-b^{62, 14}_2 ∧  b^{62, 14}_1 ∧  b^{62, 14}_0 ∧ true) 
c  in CNF:
c     b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ false 
c  in DIMACS:
 17672 -17673 -17674  0
c  -3 does not represent an automaton state.
c    -( b^{62, 14}_2 ∧  b^{62, 14}_1 ∧  b^{62, 14}_0 ∧ true) 
c  in CNF:
c    -b^{62, 14}_2 ∨ -b^{62, 14}_1 ∨ -b^{62, 14}_0 ∨ false 
c  in DIMACS:
-17672 -17673 -17674  0

c i = 15
c  -2+1 --> -1
c    ( b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧  p_930) -> ( b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0)
c  in CNF:
c    -b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨  b^{62, 16}_2
c    -b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_1
c    -b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨  b^{62, 16}_0
c  in DIMACS:
-17675 -17676  17677 -930  17678 0
-17675 -17676  17677 -930 -17679 0
-17675 -17676  17677 -930  17680 0

c  -1+1 --> 0
c    ( b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0 ∧  p_930) -> (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧ -b^{62, 16}_0)
c  in CNF:
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_2
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_1
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_0
c  in DIMACS:
-17675  17676 -17677 -930 -17678 0
-17675  17676 -17677 -930 -17679 0
-17675  17676 -17677 -930 -17680 0

c  0+1 --> 1
c    (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧  p_930) -> (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0)
c  in CNF:
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_2
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_1
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨  b^{62, 16}_0
c  in DIMACS:
 17675  17676  17677 -930 -17678 0
 17675  17676  17677 -930 -17679 0
 17675  17676  17677 -930  17680 0

c  1+1 --> 2
c    (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0 ∧  p_930) -> (-b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0)
c  in CNF:
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_2
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨  b^{62, 16}_1
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ -p_930 ∨ -b^{62, 16}_0
c  in DIMACS:
 17675  17676 -17677 -930 -17678 0
 17675  17676 -17677 -930  17679 0
 17675  17676 -17677 -930 -17680 0

c  2+1 --> break 
c    (-b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧  p_930) -> break
c  in CNF:
c     b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 17675 -17676  17677 -930 1162 0


c  2-1 --> 1
c    (-b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧ -p_930) -> (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0)
c  in CNF:
c     b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_2
c     b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_1
c     b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨  b^{62, 16}_0
c  in DIMACS:
 17675 -17676  17677  930 -17678 0
 17675 -17676  17677  930 -17679 0
 17675 -17676  17677  930  17680 0

c  1-1 --> 0
c    (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0 ∧ -p_930) -> (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧ -b^{62, 16}_0)
c  in CNF:
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_2
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_1
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_0
c  in DIMACS:
 17675  17676 -17677  930 -17678 0
 17675  17676 -17677  930 -17679 0
 17675  17676 -17677  930 -17680 0

c  0-1 --> -1
c    (-b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧ -p_930) -> ( b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0)
c  in CNF:
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨  b^{62, 16}_2
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_1
c     b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨  b^{62, 16}_0
c  in DIMACS:
 17675  17676  17677  930  17678 0
 17675  17676  17677  930 -17679 0
 17675  17676  17677  930  17680 0

c  -1-1 --> -2
c    ( b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧  b^{62, 15}_0 ∧ -p_930) -> ( b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0)
c  in CNF:
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨  b^{62, 16}_2
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨  b^{62, 16}_1
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨  p_930 ∨ -b^{62, 16}_0
c  in DIMACS:
-17675  17676 -17677  930  17678 0
-17675  17676 -17677  930  17679 0
-17675  17676 -17677  930 -17680 0

c  -2-1 --> break 
c    ( b^{62, 15}_2 ∧  b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨  b^{62, 15}_0 ∨  p_930 ∨ break
c  in DIMACS:
-17675 -17676  17677  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 15}_2 ∧ -b^{62, 15}_1 ∧ -b^{62, 15}_0 ∧ true) 
c  in CNF:
c    -b^{62, 15}_2 ∨  b^{62, 15}_1 ∨  b^{62, 15}_0 ∨ false 
c  in DIMACS:
-17675  17676  17677  0

c  3 does not represent an automaton state.
c    -(-b^{62, 15}_2 ∧  b^{62, 15}_1 ∧  b^{62, 15}_0 ∧ true) 
c  in CNF:
c     b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ false 
c  in DIMACS:
 17675 -17676 -17677  0
c  -3 does not represent an automaton state.
c    -( b^{62, 15}_2 ∧  b^{62, 15}_1 ∧  b^{62, 15}_0 ∧ true) 
c  in CNF:
c    -b^{62, 15}_2 ∨ -b^{62, 15}_1 ∨ -b^{62, 15}_0 ∨ false 
c  in DIMACS:
-17675 -17676 -17677  0

c i = 16
c  -2+1 --> -1
c    ( b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧  p_992) -> ( b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0)
c  in CNF:
c    -b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨  b^{62, 17}_2
c    -b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_1
c    -b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨  b^{62, 17}_0
c  in DIMACS:
-17678 -17679  17680 -992  17681 0
-17678 -17679  17680 -992 -17682 0
-17678 -17679  17680 -992  17683 0

c  -1+1 --> 0
c    ( b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0 ∧  p_992) -> (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧ -b^{62, 17}_0)
c  in CNF:
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_2
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_1
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_0
c  in DIMACS:
-17678  17679 -17680 -992 -17681 0
-17678  17679 -17680 -992 -17682 0
-17678  17679 -17680 -992 -17683 0

c  0+1 --> 1
c    (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧  p_992) -> (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0)
c  in CNF:
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_2
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_1
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨  b^{62, 17}_0
c  in DIMACS:
 17678  17679  17680 -992 -17681 0
 17678  17679  17680 -992 -17682 0
 17678  17679  17680 -992  17683 0

c  1+1 --> 2
c    (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0 ∧  p_992) -> (-b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0)
c  in CNF:
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_2
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨  b^{62, 17}_1
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ -p_992 ∨ -b^{62, 17}_0
c  in DIMACS:
 17678  17679 -17680 -992 -17681 0
 17678  17679 -17680 -992  17682 0
 17678  17679 -17680 -992 -17683 0

c  2+1 --> break 
c    (-b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧  p_992) -> break
c  in CNF:
c     b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 17678 -17679  17680 -992 1162 0


c  2-1 --> 1
c    (-b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧ -p_992) -> (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0)
c  in CNF:
c     b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_2
c     b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_1
c     b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨  b^{62, 17}_0
c  in DIMACS:
 17678 -17679  17680  992 -17681 0
 17678 -17679  17680  992 -17682 0
 17678 -17679  17680  992  17683 0

c  1-1 --> 0
c    (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0 ∧ -p_992) -> (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧ -b^{62, 17}_0)
c  in CNF:
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_2
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_1
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_0
c  in DIMACS:
 17678  17679 -17680  992 -17681 0
 17678  17679 -17680  992 -17682 0
 17678  17679 -17680  992 -17683 0

c  0-1 --> -1
c    (-b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧ -p_992) -> ( b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0)
c  in CNF:
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨  b^{62, 17}_2
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_1
c     b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨  b^{62, 17}_0
c  in DIMACS:
 17678  17679  17680  992  17681 0
 17678  17679  17680  992 -17682 0
 17678  17679  17680  992  17683 0

c  -1-1 --> -2
c    ( b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧  b^{62, 16}_0 ∧ -p_992) -> ( b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0)
c  in CNF:
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨  b^{62, 17}_2
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨  b^{62, 17}_1
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨  p_992 ∨ -b^{62, 17}_0
c  in DIMACS:
-17678  17679 -17680  992  17681 0
-17678  17679 -17680  992  17682 0
-17678  17679 -17680  992 -17683 0

c  -2-1 --> break 
c    ( b^{62, 16}_2 ∧  b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨  b^{62, 16}_0 ∨  p_992 ∨ break
c  in DIMACS:
-17678 -17679  17680  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 16}_2 ∧ -b^{62, 16}_1 ∧ -b^{62, 16}_0 ∧ true) 
c  in CNF:
c    -b^{62, 16}_2 ∨  b^{62, 16}_1 ∨  b^{62, 16}_0 ∨ false 
c  in DIMACS:
-17678  17679  17680  0

c  3 does not represent an automaton state.
c    -(-b^{62, 16}_2 ∧  b^{62, 16}_1 ∧  b^{62, 16}_0 ∧ true) 
c  in CNF:
c     b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ false 
c  in DIMACS:
 17678 -17679 -17680  0
c  -3 does not represent an automaton state.
c    -( b^{62, 16}_2 ∧  b^{62, 16}_1 ∧  b^{62, 16}_0 ∧ true) 
c  in CNF:
c    -b^{62, 16}_2 ∨ -b^{62, 16}_1 ∨ -b^{62, 16}_0 ∨ false 
c  in DIMACS:
-17678 -17679 -17680  0

c i = 17
c  -2+1 --> -1
c    ( b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧  p_1054) -> ( b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0)
c  in CNF:
c    -b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨  b^{62, 18}_2
c    -b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_1
c    -b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨  b^{62, 18}_0
c  in DIMACS:
-17681 -17682  17683 -1054  17684 0
-17681 -17682  17683 -1054 -17685 0
-17681 -17682  17683 -1054  17686 0

c  -1+1 --> 0
c    ( b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0 ∧  p_1054) -> (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧ -b^{62, 18}_0)
c  in CNF:
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_2
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_1
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_0
c  in DIMACS:
-17681  17682 -17683 -1054 -17684 0
-17681  17682 -17683 -1054 -17685 0
-17681  17682 -17683 -1054 -17686 0

c  0+1 --> 1
c    (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧  p_1054) -> (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0)
c  in CNF:
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_2
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_1
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨  b^{62, 18}_0
c  in DIMACS:
 17681  17682  17683 -1054 -17684 0
 17681  17682  17683 -1054 -17685 0
 17681  17682  17683 -1054  17686 0

c  1+1 --> 2
c    (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0 ∧  p_1054) -> (-b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0)
c  in CNF:
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_2
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨  b^{62, 18}_1
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ -p_1054 ∨ -b^{62, 18}_0
c  in DIMACS:
 17681  17682 -17683 -1054 -17684 0
 17681  17682 -17683 -1054  17685 0
 17681  17682 -17683 -1054 -17686 0

c  2+1 --> break 
c    (-b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧  p_1054) -> break
c  in CNF:
c     b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ -p_1054 ∨ break
c  in DIMACS:
 17681 -17682  17683 -1054 1162 0


c  2-1 --> 1
c    (-b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧ -p_1054) -> (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0)
c  in CNF:
c     b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_2
c     b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_1
c     b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨  b^{62, 18}_0
c  in DIMACS:
 17681 -17682  17683  1054 -17684 0
 17681 -17682  17683  1054 -17685 0
 17681 -17682  17683  1054  17686 0

c  1-1 --> 0
c    (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0 ∧ -p_1054) -> (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧ -b^{62, 18}_0)
c  in CNF:
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_2
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_1
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_0
c  in DIMACS:
 17681  17682 -17683  1054 -17684 0
 17681  17682 -17683  1054 -17685 0
 17681  17682 -17683  1054 -17686 0

c  0-1 --> -1
c    (-b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧ -p_1054) -> ( b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0)
c  in CNF:
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨  b^{62, 18}_2
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_1
c     b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨  b^{62, 18}_0
c  in DIMACS:
 17681  17682  17683  1054  17684 0
 17681  17682  17683  1054 -17685 0
 17681  17682  17683  1054  17686 0

c  -1-1 --> -2
c    ( b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧  b^{62, 17}_0 ∧ -p_1054) -> ( b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0)
c  in CNF:
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨  b^{62, 18}_2
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨  b^{62, 18}_1
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨  p_1054 ∨ -b^{62, 18}_0
c  in DIMACS:
-17681  17682 -17683  1054  17684 0
-17681  17682 -17683  1054  17685 0
-17681  17682 -17683  1054 -17686 0

c  -2-1 --> break 
c    ( b^{62, 17}_2 ∧  b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧ -p_1054) -> break
c  in CNF:
c    -b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨  b^{62, 17}_0 ∨  p_1054 ∨ break
c  in DIMACS:
-17681 -17682  17683  1054 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 17}_2 ∧ -b^{62, 17}_1 ∧ -b^{62, 17}_0 ∧ true) 
c  in CNF:
c    -b^{62, 17}_2 ∨  b^{62, 17}_1 ∨  b^{62, 17}_0 ∨ false 
c  in DIMACS:
-17681  17682  17683  0

c  3 does not represent an automaton state.
c    -(-b^{62, 17}_2 ∧  b^{62, 17}_1 ∧  b^{62, 17}_0 ∧ true) 
c  in CNF:
c     b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ false 
c  in DIMACS:
 17681 -17682 -17683  0
c  -3 does not represent an automaton state.
c    -( b^{62, 17}_2 ∧  b^{62, 17}_1 ∧  b^{62, 17}_0 ∧ true) 
c  in CNF:
c    -b^{62, 17}_2 ∨ -b^{62, 17}_1 ∨ -b^{62, 17}_0 ∨ false 
c  in DIMACS:
-17681 -17682 -17683  0

c i = 18
c  -2+1 --> -1
c    ( b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧  p_1116) -> ( b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧  b^{62, 19}_0)
c  in CNF:
c    -b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨  b^{62, 19}_2
c    -b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_1
c    -b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨  b^{62, 19}_0
c  in DIMACS:
-17684 -17685  17686 -1116  17687 0
-17684 -17685  17686 -1116 -17688 0
-17684 -17685  17686 -1116  17689 0

c  -1+1 --> 0
c    ( b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0 ∧  p_1116) -> (-b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧ -b^{62, 19}_0)
c  in CNF:
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_2
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_1
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_0
c  in DIMACS:
-17684  17685 -17686 -1116 -17687 0
-17684  17685 -17686 -1116 -17688 0
-17684  17685 -17686 -1116 -17689 0

c  0+1 --> 1
c    (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧  p_1116) -> (-b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧  b^{62, 19}_0)
c  in CNF:
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_2
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_1
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨  b^{62, 19}_0
c  in DIMACS:
 17684  17685  17686 -1116 -17687 0
 17684  17685  17686 -1116 -17688 0
 17684  17685  17686 -1116  17689 0

c  1+1 --> 2
c    (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0 ∧  p_1116) -> (-b^{62, 19}_2 ∧  b^{62, 19}_1 ∧ -b^{62, 19}_0)
c  in CNF:
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_2
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨  b^{62, 19}_1
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ -p_1116 ∨ -b^{62, 19}_0
c  in DIMACS:
 17684  17685 -17686 -1116 -17687 0
 17684  17685 -17686 -1116  17688 0
 17684  17685 -17686 -1116 -17689 0

c  2+1 --> break 
c    (-b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 17684 -17685  17686 -1116 1162 0


c  2-1 --> 1
c    (-b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧ -p_1116) -> (-b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧  b^{62, 19}_0)
c  in CNF:
c     b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_2
c     b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_1
c     b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨  b^{62, 19}_0
c  in DIMACS:
 17684 -17685  17686  1116 -17687 0
 17684 -17685  17686  1116 -17688 0
 17684 -17685  17686  1116  17689 0

c  1-1 --> 0
c    (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0 ∧ -p_1116) -> (-b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧ -b^{62, 19}_0)
c  in CNF:
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_2
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_1
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_0
c  in DIMACS:
 17684  17685 -17686  1116 -17687 0
 17684  17685 -17686  1116 -17688 0
 17684  17685 -17686  1116 -17689 0

c  0-1 --> -1
c    (-b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧ -p_1116) -> ( b^{62, 19}_2 ∧ -b^{62, 19}_1 ∧  b^{62, 19}_0)
c  in CNF:
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨  b^{62, 19}_2
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_1
c     b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨  b^{62, 19}_0
c  in DIMACS:
 17684  17685  17686  1116  17687 0
 17684  17685  17686  1116 -17688 0
 17684  17685  17686  1116  17689 0

c  -1-1 --> -2
c    ( b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧  b^{62, 18}_0 ∧ -p_1116) -> ( b^{62, 19}_2 ∧  b^{62, 19}_1 ∧ -b^{62, 19}_0)
c  in CNF:
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨  b^{62, 19}_2
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨  b^{62, 19}_1
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨  p_1116 ∨ -b^{62, 19}_0
c  in DIMACS:
-17684  17685 -17686  1116  17687 0
-17684  17685 -17686  1116  17688 0
-17684  17685 -17686  1116 -17689 0

c  -2-1 --> break 
c    ( b^{62, 18}_2 ∧  b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨  b^{62, 18}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-17684 -17685  17686  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{62, 18}_2 ∧ -b^{62, 18}_1 ∧ -b^{62, 18}_0 ∧ true) 
c  in CNF:
c    -b^{62, 18}_2 ∨  b^{62, 18}_1 ∨  b^{62, 18}_0 ∨ false 
c  in DIMACS:
-17684  17685  17686  0

c  3 does not represent an automaton state.
c    -(-b^{62, 18}_2 ∧  b^{62, 18}_1 ∧  b^{62, 18}_0 ∧ true) 
c  in CNF:
c     b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ false 
c  in DIMACS:
 17684 -17685 -17686  0
c  -3 does not represent an automaton state.
c    -( b^{62, 18}_2 ∧  b^{62, 18}_1 ∧  b^{62, 18}_0 ∧ true) 
c  in CNF:
c    -b^{62, 18}_2 ∨ -b^{62, 18}_1 ∨ -b^{62, 18}_0 ∨ false 
c  in DIMACS:
-17684 -17685 -17686  0

c INIT for k = 63
c    -b^{63, 1}_2
c    -b^{63, 1}_1
c    -b^{63, 1}_0
c  in DIMACS:
-17690 0
-17691 0
-17692 0

c Transitions for k = 63
c i = 1
c  -2+1 --> -1
c    ( b^{63, 1}_2 ∧  b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧  p_63) -> ( b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0)
c  in CNF:
c    -b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨  b^{63, 2}_2
c    -b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_1
c    -b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨  b^{63, 2}_0
c  in DIMACS:
-17690 -17691  17692 -63  17693 0
-17690 -17691  17692 -63 -17694 0
-17690 -17691  17692 -63  17695 0

c  -1+1 --> 0
c    ( b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧  b^{63, 1}_0 ∧  p_63) -> (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧ -b^{63, 2}_0)
c  in CNF:
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_2
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_1
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_0
c  in DIMACS:
-17690  17691 -17692 -63 -17693 0
-17690  17691 -17692 -63 -17694 0
-17690  17691 -17692 -63 -17695 0

c  0+1 --> 1
c    (-b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧  p_63) -> (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0)
c  in CNF:
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_2
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_1
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨  b^{63, 2}_0
c  in DIMACS:
 17690  17691  17692 -63 -17693 0
 17690  17691  17692 -63 -17694 0
 17690  17691  17692 -63  17695 0

c  1+1 --> 2
c    (-b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧  b^{63, 1}_0 ∧  p_63) -> (-b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0)
c  in CNF:
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_2
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨  b^{63, 2}_1
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ -p_63 ∨ -b^{63, 2}_0
c  in DIMACS:
 17690  17691 -17692 -63 -17693 0
 17690  17691 -17692 -63  17694 0
 17690  17691 -17692 -63 -17695 0

c  2+1 --> break 
c    (-b^{63, 1}_2 ∧  b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧  p_63) -> break
c  in CNF:
c     b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ -p_63 ∨ break
c  in DIMACS:
 17690 -17691  17692 -63 1162 0


c  2-1 --> 1
c    (-b^{63, 1}_2 ∧  b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧ -p_63) -> (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0)
c  in CNF:
c     b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_2
c     b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_1
c     b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨  b^{63, 2}_0
c  in DIMACS:
 17690 -17691  17692  63 -17693 0
 17690 -17691  17692  63 -17694 0
 17690 -17691  17692  63  17695 0

c  1-1 --> 0
c    (-b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧  b^{63, 1}_0 ∧ -p_63) -> (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧ -b^{63, 2}_0)
c  in CNF:
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_2
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_1
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_0
c  in DIMACS:
 17690  17691 -17692  63 -17693 0
 17690  17691 -17692  63 -17694 0
 17690  17691 -17692  63 -17695 0

c  0-1 --> -1
c    (-b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧ -p_63) -> ( b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0)
c  in CNF:
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨  b^{63, 2}_2
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_1
c     b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨  b^{63, 2}_0
c  in DIMACS:
 17690  17691  17692  63  17693 0
 17690  17691  17692  63 -17694 0
 17690  17691  17692  63  17695 0

c  -1-1 --> -2
c    ( b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧  b^{63, 1}_0 ∧ -p_63) -> ( b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0)
c  in CNF:
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨  b^{63, 2}_2
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨  b^{63, 2}_1
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨  p_63 ∨ -b^{63, 2}_0
c  in DIMACS:
-17690  17691 -17692  63  17693 0
-17690  17691 -17692  63  17694 0
-17690  17691 -17692  63 -17695 0

c  -2-1 --> break 
c    ( b^{63, 1}_2 ∧  b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧ -p_63) -> break
c  in CNF:
c    -b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨  b^{63, 1}_0 ∨  p_63 ∨ break
c  in DIMACS:
-17690 -17691  17692  63 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 1}_2 ∧ -b^{63, 1}_1 ∧ -b^{63, 1}_0 ∧ true) 
c  in CNF:
c    -b^{63, 1}_2 ∨  b^{63, 1}_1 ∨  b^{63, 1}_0 ∨ false 
c  in DIMACS:
-17690  17691  17692  0

c  3 does not represent an automaton state.
c    -(-b^{63, 1}_2 ∧  b^{63, 1}_1 ∧  b^{63, 1}_0 ∧ true) 
c  in CNF:
c     b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ false 
c  in DIMACS:
 17690 -17691 -17692  0
c  -3 does not represent an automaton state.
c    -( b^{63, 1}_2 ∧  b^{63, 1}_1 ∧  b^{63, 1}_0 ∧ true) 
c  in CNF:
c    -b^{63, 1}_2 ∨ -b^{63, 1}_1 ∨ -b^{63, 1}_0 ∨ false 
c  in DIMACS:
-17690 -17691 -17692  0

c i = 2
c  -2+1 --> -1
c    ( b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧  p_126) -> ( b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0)
c  in CNF:
c    -b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨  b^{63, 3}_2
c    -b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_1
c    -b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨  b^{63, 3}_0
c  in DIMACS:
-17693 -17694  17695 -126  17696 0
-17693 -17694  17695 -126 -17697 0
-17693 -17694  17695 -126  17698 0

c  -1+1 --> 0
c    ( b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0 ∧  p_126) -> (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧ -b^{63, 3}_0)
c  in CNF:
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_2
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_1
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_0
c  in DIMACS:
-17693  17694 -17695 -126 -17696 0
-17693  17694 -17695 -126 -17697 0
-17693  17694 -17695 -126 -17698 0

c  0+1 --> 1
c    (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧  p_126) -> (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0)
c  in CNF:
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_2
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_1
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨  b^{63, 3}_0
c  in DIMACS:
 17693  17694  17695 -126 -17696 0
 17693  17694  17695 -126 -17697 0
 17693  17694  17695 -126  17698 0

c  1+1 --> 2
c    (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0 ∧  p_126) -> (-b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0)
c  in CNF:
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_2
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨  b^{63, 3}_1
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ -p_126 ∨ -b^{63, 3}_0
c  in DIMACS:
 17693  17694 -17695 -126 -17696 0
 17693  17694 -17695 -126  17697 0
 17693  17694 -17695 -126 -17698 0

c  2+1 --> break 
c    (-b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧  p_126) -> break
c  in CNF:
c     b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 17693 -17694  17695 -126 1162 0


c  2-1 --> 1
c    (-b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧ -p_126) -> (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0)
c  in CNF:
c     b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_2
c     b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_1
c     b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨  b^{63, 3}_0
c  in DIMACS:
 17693 -17694  17695  126 -17696 0
 17693 -17694  17695  126 -17697 0
 17693 -17694  17695  126  17698 0

c  1-1 --> 0
c    (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0 ∧ -p_126) -> (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧ -b^{63, 3}_0)
c  in CNF:
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_2
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_1
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_0
c  in DIMACS:
 17693  17694 -17695  126 -17696 0
 17693  17694 -17695  126 -17697 0
 17693  17694 -17695  126 -17698 0

c  0-1 --> -1
c    (-b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧ -p_126) -> ( b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0)
c  in CNF:
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨  b^{63, 3}_2
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_1
c     b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨  b^{63, 3}_0
c  in DIMACS:
 17693  17694  17695  126  17696 0
 17693  17694  17695  126 -17697 0
 17693  17694  17695  126  17698 0

c  -1-1 --> -2
c    ( b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧  b^{63, 2}_0 ∧ -p_126) -> ( b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0)
c  in CNF:
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨  b^{63, 3}_2
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨  b^{63, 3}_1
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨  p_126 ∨ -b^{63, 3}_0
c  in DIMACS:
-17693  17694 -17695  126  17696 0
-17693  17694 -17695  126  17697 0
-17693  17694 -17695  126 -17698 0

c  -2-1 --> break 
c    ( b^{63, 2}_2 ∧  b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨  b^{63, 2}_0 ∨  p_126 ∨ break
c  in DIMACS:
-17693 -17694  17695  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 2}_2 ∧ -b^{63, 2}_1 ∧ -b^{63, 2}_0 ∧ true) 
c  in CNF:
c    -b^{63, 2}_2 ∨  b^{63, 2}_1 ∨  b^{63, 2}_0 ∨ false 
c  in DIMACS:
-17693  17694  17695  0

c  3 does not represent an automaton state.
c    -(-b^{63, 2}_2 ∧  b^{63, 2}_1 ∧  b^{63, 2}_0 ∧ true) 
c  in CNF:
c     b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ false 
c  in DIMACS:
 17693 -17694 -17695  0
c  -3 does not represent an automaton state.
c    -( b^{63, 2}_2 ∧  b^{63, 2}_1 ∧  b^{63, 2}_0 ∧ true) 
c  in CNF:
c    -b^{63, 2}_2 ∨ -b^{63, 2}_1 ∨ -b^{63, 2}_0 ∨ false 
c  in DIMACS:
-17693 -17694 -17695  0

c i = 3
c  -2+1 --> -1
c    ( b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧  p_189) -> ( b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0)
c  in CNF:
c    -b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨  b^{63, 4}_2
c    -b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_1
c    -b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨  b^{63, 4}_0
c  in DIMACS:
-17696 -17697  17698 -189  17699 0
-17696 -17697  17698 -189 -17700 0
-17696 -17697  17698 -189  17701 0

c  -1+1 --> 0
c    ( b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0 ∧  p_189) -> (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧ -b^{63, 4}_0)
c  in CNF:
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_2
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_1
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_0
c  in DIMACS:
-17696  17697 -17698 -189 -17699 0
-17696  17697 -17698 -189 -17700 0
-17696  17697 -17698 -189 -17701 0

c  0+1 --> 1
c    (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧  p_189) -> (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0)
c  in CNF:
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_2
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_1
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨  b^{63, 4}_0
c  in DIMACS:
 17696  17697  17698 -189 -17699 0
 17696  17697  17698 -189 -17700 0
 17696  17697  17698 -189  17701 0

c  1+1 --> 2
c    (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0 ∧  p_189) -> (-b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0)
c  in CNF:
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_2
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨  b^{63, 4}_1
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ -p_189 ∨ -b^{63, 4}_0
c  in DIMACS:
 17696  17697 -17698 -189 -17699 0
 17696  17697 -17698 -189  17700 0
 17696  17697 -17698 -189 -17701 0

c  2+1 --> break 
c    (-b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧  p_189) -> break
c  in CNF:
c     b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 17696 -17697  17698 -189 1162 0


c  2-1 --> 1
c    (-b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧ -p_189) -> (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0)
c  in CNF:
c     b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_2
c     b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_1
c     b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨  b^{63, 4}_0
c  in DIMACS:
 17696 -17697  17698  189 -17699 0
 17696 -17697  17698  189 -17700 0
 17696 -17697  17698  189  17701 0

c  1-1 --> 0
c    (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0 ∧ -p_189) -> (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧ -b^{63, 4}_0)
c  in CNF:
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_2
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_1
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_0
c  in DIMACS:
 17696  17697 -17698  189 -17699 0
 17696  17697 -17698  189 -17700 0
 17696  17697 -17698  189 -17701 0

c  0-1 --> -1
c    (-b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧ -p_189) -> ( b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0)
c  in CNF:
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨  b^{63, 4}_2
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_1
c     b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨  b^{63, 4}_0
c  in DIMACS:
 17696  17697  17698  189  17699 0
 17696  17697  17698  189 -17700 0
 17696  17697  17698  189  17701 0

c  -1-1 --> -2
c    ( b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧  b^{63, 3}_0 ∧ -p_189) -> ( b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0)
c  in CNF:
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨  b^{63, 4}_2
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨  b^{63, 4}_1
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨  p_189 ∨ -b^{63, 4}_0
c  in DIMACS:
-17696  17697 -17698  189  17699 0
-17696  17697 -17698  189  17700 0
-17696  17697 -17698  189 -17701 0

c  -2-1 --> break 
c    ( b^{63, 3}_2 ∧  b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨  b^{63, 3}_0 ∨  p_189 ∨ break
c  in DIMACS:
-17696 -17697  17698  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 3}_2 ∧ -b^{63, 3}_1 ∧ -b^{63, 3}_0 ∧ true) 
c  in CNF:
c    -b^{63, 3}_2 ∨  b^{63, 3}_1 ∨  b^{63, 3}_0 ∨ false 
c  in DIMACS:
-17696  17697  17698  0

c  3 does not represent an automaton state.
c    -(-b^{63, 3}_2 ∧  b^{63, 3}_1 ∧  b^{63, 3}_0 ∧ true) 
c  in CNF:
c     b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ false 
c  in DIMACS:
 17696 -17697 -17698  0
c  -3 does not represent an automaton state.
c    -( b^{63, 3}_2 ∧  b^{63, 3}_1 ∧  b^{63, 3}_0 ∧ true) 
c  in CNF:
c    -b^{63, 3}_2 ∨ -b^{63, 3}_1 ∨ -b^{63, 3}_0 ∨ false 
c  in DIMACS:
-17696 -17697 -17698  0

c i = 4
c  -2+1 --> -1
c    ( b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧  p_252) -> ( b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0)
c  in CNF:
c    -b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨  b^{63, 5}_2
c    -b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_1
c    -b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨  b^{63, 5}_0
c  in DIMACS:
-17699 -17700  17701 -252  17702 0
-17699 -17700  17701 -252 -17703 0
-17699 -17700  17701 -252  17704 0

c  -1+1 --> 0
c    ( b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0 ∧  p_252) -> (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧ -b^{63, 5}_0)
c  in CNF:
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_2
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_1
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_0
c  in DIMACS:
-17699  17700 -17701 -252 -17702 0
-17699  17700 -17701 -252 -17703 0
-17699  17700 -17701 -252 -17704 0

c  0+1 --> 1
c    (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧  p_252) -> (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0)
c  in CNF:
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_2
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_1
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨  b^{63, 5}_0
c  in DIMACS:
 17699  17700  17701 -252 -17702 0
 17699  17700  17701 -252 -17703 0
 17699  17700  17701 -252  17704 0

c  1+1 --> 2
c    (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0 ∧  p_252) -> (-b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0)
c  in CNF:
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_2
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨  b^{63, 5}_1
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ -p_252 ∨ -b^{63, 5}_0
c  in DIMACS:
 17699  17700 -17701 -252 -17702 0
 17699  17700 -17701 -252  17703 0
 17699  17700 -17701 -252 -17704 0

c  2+1 --> break 
c    (-b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧  p_252) -> break
c  in CNF:
c     b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 17699 -17700  17701 -252 1162 0


c  2-1 --> 1
c    (-b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧ -p_252) -> (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0)
c  in CNF:
c     b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_2
c     b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_1
c     b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨  b^{63, 5}_0
c  in DIMACS:
 17699 -17700  17701  252 -17702 0
 17699 -17700  17701  252 -17703 0
 17699 -17700  17701  252  17704 0

c  1-1 --> 0
c    (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0 ∧ -p_252) -> (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧ -b^{63, 5}_0)
c  in CNF:
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_2
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_1
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_0
c  in DIMACS:
 17699  17700 -17701  252 -17702 0
 17699  17700 -17701  252 -17703 0
 17699  17700 -17701  252 -17704 0

c  0-1 --> -1
c    (-b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧ -p_252) -> ( b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0)
c  in CNF:
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨  b^{63, 5}_2
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_1
c     b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨  b^{63, 5}_0
c  in DIMACS:
 17699  17700  17701  252  17702 0
 17699  17700  17701  252 -17703 0
 17699  17700  17701  252  17704 0

c  -1-1 --> -2
c    ( b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧  b^{63, 4}_0 ∧ -p_252) -> ( b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0)
c  in CNF:
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨  b^{63, 5}_2
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨  b^{63, 5}_1
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨  p_252 ∨ -b^{63, 5}_0
c  in DIMACS:
-17699  17700 -17701  252  17702 0
-17699  17700 -17701  252  17703 0
-17699  17700 -17701  252 -17704 0

c  -2-1 --> break 
c    ( b^{63, 4}_2 ∧  b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨  b^{63, 4}_0 ∨  p_252 ∨ break
c  in DIMACS:
-17699 -17700  17701  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 4}_2 ∧ -b^{63, 4}_1 ∧ -b^{63, 4}_0 ∧ true) 
c  in CNF:
c    -b^{63, 4}_2 ∨  b^{63, 4}_1 ∨  b^{63, 4}_0 ∨ false 
c  in DIMACS:
-17699  17700  17701  0

c  3 does not represent an automaton state.
c    -(-b^{63, 4}_2 ∧  b^{63, 4}_1 ∧  b^{63, 4}_0 ∧ true) 
c  in CNF:
c     b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ false 
c  in DIMACS:
 17699 -17700 -17701  0
c  -3 does not represent an automaton state.
c    -( b^{63, 4}_2 ∧  b^{63, 4}_1 ∧  b^{63, 4}_0 ∧ true) 
c  in CNF:
c    -b^{63, 4}_2 ∨ -b^{63, 4}_1 ∨ -b^{63, 4}_0 ∨ false 
c  in DIMACS:
-17699 -17700 -17701  0

c i = 5
c  -2+1 --> -1
c    ( b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧  p_315) -> ( b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0)
c  in CNF:
c    -b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨  b^{63, 6}_2
c    -b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_1
c    -b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨  b^{63, 6}_0
c  in DIMACS:
-17702 -17703  17704 -315  17705 0
-17702 -17703  17704 -315 -17706 0
-17702 -17703  17704 -315  17707 0

c  -1+1 --> 0
c    ( b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0 ∧  p_315) -> (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧ -b^{63, 6}_0)
c  in CNF:
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_2
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_1
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_0
c  in DIMACS:
-17702  17703 -17704 -315 -17705 0
-17702  17703 -17704 -315 -17706 0
-17702  17703 -17704 -315 -17707 0

c  0+1 --> 1
c    (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧  p_315) -> (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0)
c  in CNF:
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_2
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_1
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨  b^{63, 6}_0
c  in DIMACS:
 17702  17703  17704 -315 -17705 0
 17702  17703  17704 -315 -17706 0
 17702  17703  17704 -315  17707 0

c  1+1 --> 2
c    (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0 ∧  p_315) -> (-b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0)
c  in CNF:
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_2
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨  b^{63, 6}_1
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ -p_315 ∨ -b^{63, 6}_0
c  in DIMACS:
 17702  17703 -17704 -315 -17705 0
 17702  17703 -17704 -315  17706 0
 17702  17703 -17704 -315 -17707 0

c  2+1 --> break 
c    (-b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧  p_315) -> break
c  in CNF:
c     b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 17702 -17703  17704 -315 1162 0


c  2-1 --> 1
c    (-b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧ -p_315) -> (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0)
c  in CNF:
c     b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_2
c     b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_1
c     b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨  b^{63, 6}_0
c  in DIMACS:
 17702 -17703  17704  315 -17705 0
 17702 -17703  17704  315 -17706 0
 17702 -17703  17704  315  17707 0

c  1-1 --> 0
c    (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0 ∧ -p_315) -> (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧ -b^{63, 6}_0)
c  in CNF:
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_2
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_1
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_0
c  in DIMACS:
 17702  17703 -17704  315 -17705 0
 17702  17703 -17704  315 -17706 0
 17702  17703 -17704  315 -17707 0

c  0-1 --> -1
c    (-b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧ -p_315) -> ( b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0)
c  in CNF:
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨  b^{63, 6}_2
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_1
c     b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨  b^{63, 6}_0
c  in DIMACS:
 17702  17703  17704  315  17705 0
 17702  17703  17704  315 -17706 0
 17702  17703  17704  315  17707 0

c  -1-1 --> -2
c    ( b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧  b^{63, 5}_0 ∧ -p_315) -> ( b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0)
c  in CNF:
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨  b^{63, 6}_2
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨  b^{63, 6}_1
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨  p_315 ∨ -b^{63, 6}_0
c  in DIMACS:
-17702  17703 -17704  315  17705 0
-17702  17703 -17704  315  17706 0
-17702  17703 -17704  315 -17707 0

c  -2-1 --> break 
c    ( b^{63, 5}_2 ∧  b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨  b^{63, 5}_0 ∨  p_315 ∨ break
c  in DIMACS:
-17702 -17703  17704  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 5}_2 ∧ -b^{63, 5}_1 ∧ -b^{63, 5}_0 ∧ true) 
c  in CNF:
c    -b^{63, 5}_2 ∨  b^{63, 5}_1 ∨  b^{63, 5}_0 ∨ false 
c  in DIMACS:
-17702  17703  17704  0

c  3 does not represent an automaton state.
c    -(-b^{63, 5}_2 ∧  b^{63, 5}_1 ∧  b^{63, 5}_0 ∧ true) 
c  in CNF:
c     b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ false 
c  in DIMACS:
 17702 -17703 -17704  0
c  -3 does not represent an automaton state.
c    -( b^{63, 5}_2 ∧  b^{63, 5}_1 ∧  b^{63, 5}_0 ∧ true) 
c  in CNF:
c    -b^{63, 5}_2 ∨ -b^{63, 5}_1 ∨ -b^{63, 5}_0 ∨ false 
c  in DIMACS:
-17702 -17703 -17704  0

c i = 6
c  -2+1 --> -1
c    ( b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧  p_378) -> ( b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0)
c  in CNF:
c    -b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨  b^{63, 7}_2
c    -b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_1
c    -b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨  b^{63, 7}_0
c  in DIMACS:
-17705 -17706  17707 -378  17708 0
-17705 -17706  17707 -378 -17709 0
-17705 -17706  17707 -378  17710 0

c  -1+1 --> 0
c    ( b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0 ∧  p_378) -> (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧ -b^{63, 7}_0)
c  in CNF:
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_2
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_1
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_0
c  in DIMACS:
-17705  17706 -17707 -378 -17708 0
-17705  17706 -17707 -378 -17709 0
-17705  17706 -17707 -378 -17710 0

c  0+1 --> 1
c    (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧  p_378) -> (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0)
c  in CNF:
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_2
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_1
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨  b^{63, 7}_0
c  in DIMACS:
 17705  17706  17707 -378 -17708 0
 17705  17706  17707 -378 -17709 0
 17705  17706  17707 -378  17710 0

c  1+1 --> 2
c    (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0 ∧  p_378) -> (-b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0)
c  in CNF:
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_2
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨  b^{63, 7}_1
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ -p_378 ∨ -b^{63, 7}_0
c  in DIMACS:
 17705  17706 -17707 -378 -17708 0
 17705  17706 -17707 -378  17709 0
 17705  17706 -17707 -378 -17710 0

c  2+1 --> break 
c    (-b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧  p_378) -> break
c  in CNF:
c     b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 17705 -17706  17707 -378 1162 0


c  2-1 --> 1
c    (-b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧ -p_378) -> (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0)
c  in CNF:
c     b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_2
c     b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_1
c     b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨  b^{63, 7}_0
c  in DIMACS:
 17705 -17706  17707  378 -17708 0
 17705 -17706  17707  378 -17709 0
 17705 -17706  17707  378  17710 0

c  1-1 --> 0
c    (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0 ∧ -p_378) -> (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧ -b^{63, 7}_0)
c  in CNF:
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_2
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_1
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_0
c  in DIMACS:
 17705  17706 -17707  378 -17708 0
 17705  17706 -17707  378 -17709 0
 17705  17706 -17707  378 -17710 0

c  0-1 --> -1
c    (-b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧ -p_378) -> ( b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0)
c  in CNF:
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨  b^{63, 7}_2
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_1
c     b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨  b^{63, 7}_0
c  in DIMACS:
 17705  17706  17707  378  17708 0
 17705  17706  17707  378 -17709 0
 17705  17706  17707  378  17710 0

c  -1-1 --> -2
c    ( b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧  b^{63, 6}_0 ∧ -p_378) -> ( b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0)
c  in CNF:
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨  b^{63, 7}_2
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨  b^{63, 7}_1
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨  p_378 ∨ -b^{63, 7}_0
c  in DIMACS:
-17705  17706 -17707  378  17708 0
-17705  17706 -17707  378  17709 0
-17705  17706 -17707  378 -17710 0

c  -2-1 --> break 
c    ( b^{63, 6}_2 ∧  b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨  b^{63, 6}_0 ∨  p_378 ∨ break
c  in DIMACS:
-17705 -17706  17707  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 6}_2 ∧ -b^{63, 6}_1 ∧ -b^{63, 6}_0 ∧ true) 
c  in CNF:
c    -b^{63, 6}_2 ∨  b^{63, 6}_1 ∨  b^{63, 6}_0 ∨ false 
c  in DIMACS:
-17705  17706  17707  0

c  3 does not represent an automaton state.
c    -(-b^{63, 6}_2 ∧  b^{63, 6}_1 ∧  b^{63, 6}_0 ∧ true) 
c  in CNF:
c     b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ false 
c  in DIMACS:
 17705 -17706 -17707  0
c  -3 does not represent an automaton state.
c    -( b^{63, 6}_2 ∧  b^{63, 6}_1 ∧  b^{63, 6}_0 ∧ true) 
c  in CNF:
c    -b^{63, 6}_2 ∨ -b^{63, 6}_1 ∨ -b^{63, 6}_0 ∨ false 
c  in DIMACS:
-17705 -17706 -17707  0

c i = 7
c  -2+1 --> -1
c    ( b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧  p_441) -> ( b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0)
c  in CNF:
c    -b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨  b^{63, 8}_2
c    -b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_1
c    -b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨  b^{63, 8}_0
c  in DIMACS:
-17708 -17709  17710 -441  17711 0
-17708 -17709  17710 -441 -17712 0
-17708 -17709  17710 -441  17713 0

c  -1+1 --> 0
c    ( b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0 ∧  p_441) -> (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧ -b^{63, 8}_0)
c  in CNF:
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_2
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_1
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_0
c  in DIMACS:
-17708  17709 -17710 -441 -17711 0
-17708  17709 -17710 -441 -17712 0
-17708  17709 -17710 -441 -17713 0

c  0+1 --> 1
c    (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧  p_441) -> (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0)
c  in CNF:
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_2
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_1
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨  b^{63, 8}_0
c  in DIMACS:
 17708  17709  17710 -441 -17711 0
 17708  17709  17710 -441 -17712 0
 17708  17709  17710 -441  17713 0

c  1+1 --> 2
c    (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0 ∧  p_441) -> (-b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0)
c  in CNF:
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_2
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨  b^{63, 8}_1
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ -p_441 ∨ -b^{63, 8}_0
c  in DIMACS:
 17708  17709 -17710 -441 -17711 0
 17708  17709 -17710 -441  17712 0
 17708  17709 -17710 -441 -17713 0

c  2+1 --> break 
c    (-b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧  p_441) -> break
c  in CNF:
c     b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 17708 -17709  17710 -441 1162 0


c  2-1 --> 1
c    (-b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧ -p_441) -> (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0)
c  in CNF:
c     b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_2
c     b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_1
c     b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨  b^{63, 8}_0
c  in DIMACS:
 17708 -17709  17710  441 -17711 0
 17708 -17709  17710  441 -17712 0
 17708 -17709  17710  441  17713 0

c  1-1 --> 0
c    (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0 ∧ -p_441) -> (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧ -b^{63, 8}_0)
c  in CNF:
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_2
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_1
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_0
c  in DIMACS:
 17708  17709 -17710  441 -17711 0
 17708  17709 -17710  441 -17712 0
 17708  17709 -17710  441 -17713 0

c  0-1 --> -1
c    (-b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧ -p_441) -> ( b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0)
c  in CNF:
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨  b^{63, 8}_2
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_1
c     b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨  b^{63, 8}_0
c  in DIMACS:
 17708  17709  17710  441  17711 0
 17708  17709  17710  441 -17712 0
 17708  17709  17710  441  17713 0

c  -1-1 --> -2
c    ( b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧  b^{63, 7}_0 ∧ -p_441) -> ( b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0)
c  in CNF:
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨  b^{63, 8}_2
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨  b^{63, 8}_1
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨  p_441 ∨ -b^{63, 8}_0
c  in DIMACS:
-17708  17709 -17710  441  17711 0
-17708  17709 -17710  441  17712 0
-17708  17709 -17710  441 -17713 0

c  -2-1 --> break 
c    ( b^{63, 7}_2 ∧  b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨  b^{63, 7}_0 ∨  p_441 ∨ break
c  in DIMACS:
-17708 -17709  17710  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 7}_2 ∧ -b^{63, 7}_1 ∧ -b^{63, 7}_0 ∧ true) 
c  in CNF:
c    -b^{63, 7}_2 ∨  b^{63, 7}_1 ∨  b^{63, 7}_0 ∨ false 
c  in DIMACS:
-17708  17709  17710  0

c  3 does not represent an automaton state.
c    -(-b^{63, 7}_2 ∧  b^{63, 7}_1 ∧  b^{63, 7}_0 ∧ true) 
c  in CNF:
c     b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ false 
c  in DIMACS:
 17708 -17709 -17710  0
c  -3 does not represent an automaton state.
c    -( b^{63, 7}_2 ∧  b^{63, 7}_1 ∧  b^{63, 7}_0 ∧ true) 
c  in CNF:
c    -b^{63, 7}_2 ∨ -b^{63, 7}_1 ∨ -b^{63, 7}_0 ∨ false 
c  in DIMACS:
-17708 -17709 -17710  0

c i = 8
c  -2+1 --> -1
c    ( b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧  p_504) -> ( b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0)
c  in CNF:
c    -b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨  b^{63, 9}_2
c    -b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_1
c    -b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨  b^{63, 9}_0
c  in DIMACS:
-17711 -17712  17713 -504  17714 0
-17711 -17712  17713 -504 -17715 0
-17711 -17712  17713 -504  17716 0

c  -1+1 --> 0
c    ( b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0 ∧  p_504) -> (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧ -b^{63, 9}_0)
c  in CNF:
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_2
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_1
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_0
c  in DIMACS:
-17711  17712 -17713 -504 -17714 0
-17711  17712 -17713 -504 -17715 0
-17711  17712 -17713 -504 -17716 0

c  0+1 --> 1
c    (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧  p_504) -> (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0)
c  in CNF:
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_2
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_1
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨  b^{63, 9}_0
c  in DIMACS:
 17711  17712  17713 -504 -17714 0
 17711  17712  17713 -504 -17715 0
 17711  17712  17713 -504  17716 0

c  1+1 --> 2
c    (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0 ∧  p_504) -> (-b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0)
c  in CNF:
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_2
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨  b^{63, 9}_1
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ -p_504 ∨ -b^{63, 9}_0
c  in DIMACS:
 17711  17712 -17713 -504 -17714 0
 17711  17712 -17713 -504  17715 0
 17711  17712 -17713 -504 -17716 0

c  2+1 --> break 
c    (-b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧  p_504) -> break
c  in CNF:
c     b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 17711 -17712  17713 -504 1162 0


c  2-1 --> 1
c    (-b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧ -p_504) -> (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0)
c  in CNF:
c     b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_2
c     b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_1
c     b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨  b^{63, 9}_0
c  in DIMACS:
 17711 -17712  17713  504 -17714 0
 17711 -17712  17713  504 -17715 0
 17711 -17712  17713  504  17716 0

c  1-1 --> 0
c    (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0 ∧ -p_504) -> (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧ -b^{63, 9}_0)
c  in CNF:
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_2
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_1
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_0
c  in DIMACS:
 17711  17712 -17713  504 -17714 0
 17711  17712 -17713  504 -17715 0
 17711  17712 -17713  504 -17716 0

c  0-1 --> -1
c    (-b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧ -p_504) -> ( b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0)
c  in CNF:
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨  b^{63, 9}_2
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_1
c     b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨  b^{63, 9}_0
c  in DIMACS:
 17711  17712  17713  504  17714 0
 17711  17712  17713  504 -17715 0
 17711  17712  17713  504  17716 0

c  -1-1 --> -2
c    ( b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧  b^{63, 8}_0 ∧ -p_504) -> ( b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0)
c  in CNF:
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨  b^{63, 9}_2
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨  b^{63, 9}_1
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨  p_504 ∨ -b^{63, 9}_0
c  in DIMACS:
-17711  17712 -17713  504  17714 0
-17711  17712 -17713  504  17715 0
-17711  17712 -17713  504 -17716 0

c  -2-1 --> break 
c    ( b^{63, 8}_2 ∧  b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨  b^{63, 8}_0 ∨  p_504 ∨ break
c  in DIMACS:
-17711 -17712  17713  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 8}_2 ∧ -b^{63, 8}_1 ∧ -b^{63, 8}_0 ∧ true) 
c  in CNF:
c    -b^{63, 8}_2 ∨  b^{63, 8}_1 ∨  b^{63, 8}_0 ∨ false 
c  in DIMACS:
-17711  17712  17713  0

c  3 does not represent an automaton state.
c    -(-b^{63, 8}_2 ∧  b^{63, 8}_1 ∧  b^{63, 8}_0 ∧ true) 
c  in CNF:
c     b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ false 
c  in DIMACS:
 17711 -17712 -17713  0
c  -3 does not represent an automaton state.
c    -( b^{63, 8}_2 ∧  b^{63, 8}_1 ∧  b^{63, 8}_0 ∧ true) 
c  in CNF:
c    -b^{63, 8}_2 ∨ -b^{63, 8}_1 ∨ -b^{63, 8}_0 ∨ false 
c  in DIMACS:
-17711 -17712 -17713  0

c i = 9
c  -2+1 --> -1
c    ( b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧  p_567) -> ( b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0)
c  in CNF:
c    -b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨  b^{63, 10}_2
c    -b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_1
c    -b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨  b^{63, 10}_0
c  in DIMACS:
-17714 -17715  17716 -567  17717 0
-17714 -17715  17716 -567 -17718 0
-17714 -17715  17716 -567  17719 0

c  -1+1 --> 0
c    ( b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0 ∧  p_567) -> (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧ -b^{63, 10}_0)
c  in CNF:
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_2
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_1
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_0
c  in DIMACS:
-17714  17715 -17716 -567 -17717 0
-17714  17715 -17716 -567 -17718 0
-17714  17715 -17716 -567 -17719 0

c  0+1 --> 1
c    (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧  p_567) -> (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0)
c  in CNF:
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_2
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_1
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨  b^{63, 10}_0
c  in DIMACS:
 17714  17715  17716 -567 -17717 0
 17714  17715  17716 -567 -17718 0
 17714  17715  17716 -567  17719 0

c  1+1 --> 2
c    (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0 ∧  p_567) -> (-b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0)
c  in CNF:
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_2
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨  b^{63, 10}_1
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ -p_567 ∨ -b^{63, 10}_0
c  in DIMACS:
 17714  17715 -17716 -567 -17717 0
 17714  17715 -17716 -567  17718 0
 17714  17715 -17716 -567 -17719 0

c  2+1 --> break 
c    (-b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧  p_567) -> break
c  in CNF:
c     b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 17714 -17715  17716 -567 1162 0


c  2-1 --> 1
c    (-b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧ -p_567) -> (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0)
c  in CNF:
c     b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_2
c     b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_1
c     b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨  b^{63, 10}_0
c  in DIMACS:
 17714 -17715  17716  567 -17717 0
 17714 -17715  17716  567 -17718 0
 17714 -17715  17716  567  17719 0

c  1-1 --> 0
c    (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0 ∧ -p_567) -> (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧ -b^{63, 10}_0)
c  in CNF:
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_2
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_1
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_0
c  in DIMACS:
 17714  17715 -17716  567 -17717 0
 17714  17715 -17716  567 -17718 0
 17714  17715 -17716  567 -17719 0

c  0-1 --> -1
c    (-b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧ -p_567) -> ( b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0)
c  in CNF:
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨  b^{63, 10}_2
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_1
c     b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨  b^{63, 10}_0
c  in DIMACS:
 17714  17715  17716  567  17717 0
 17714  17715  17716  567 -17718 0
 17714  17715  17716  567  17719 0

c  -1-1 --> -2
c    ( b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧  b^{63, 9}_0 ∧ -p_567) -> ( b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0)
c  in CNF:
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨  b^{63, 10}_2
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨  b^{63, 10}_1
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨  p_567 ∨ -b^{63, 10}_0
c  in DIMACS:
-17714  17715 -17716  567  17717 0
-17714  17715 -17716  567  17718 0
-17714  17715 -17716  567 -17719 0

c  -2-1 --> break 
c    ( b^{63, 9}_2 ∧  b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨  b^{63, 9}_0 ∨  p_567 ∨ break
c  in DIMACS:
-17714 -17715  17716  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 9}_2 ∧ -b^{63, 9}_1 ∧ -b^{63, 9}_0 ∧ true) 
c  in CNF:
c    -b^{63, 9}_2 ∨  b^{63, 9}_1 ∨  b^{63, 9}_0 ∨ false 
c  in DIMACS:
-17714  17715  17716  0

c  3 does not represent an automaton state.
c    -(-b^{63, 9}_2 ∧  b^{63, 9}_1 ∧  b^{63, 9}_0 ∧ true) 
c  in CNF:
c     b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ false 
c  in DIMACS:
 17714 -17715 -17716  0
c  -3 does not represent an automaton state.
c    -( b^{63, 9}_2 ∧  b^{63, 9}_1 ∧  b^{63, 9}_0 ∧ true) 
c  in CNF:
c    -b^{63, 9}_2 ∨ -b^{63, 9}_1 ∨ -b^{63, 9}_0 ∨ false 
c  in DIMACS:
-17714 -17715 -17716  0

c i = 10
c  -2+1 --> -1
c    ( b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧  p_630) -> ( b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0)
c  in CNF:
c    -b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨  b^{63, 11}_2
c    -b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_1
c    -b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨  b^{63, 11}_0
c  in DIMACS:
-17717 -17718  17719 -630  17720 0
-17717 -17718  17719 -630 -17721 0
-17717 -17718  17719 -630  17722 0

c  -1+1 --> 0
c    ( b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0 ∧  p_630) -> (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧ -b^{63, 11}_0)
c  in CNF:
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_2
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_1
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_0
c  in DIMACS:
-17717  17718 -17719 -630 -17720 0
-17717  17718 -17719 -630 -17721 0
-17717  17718 -17719 -630 -17722 0

c  0+1 --> 1
c    (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧  p_630) -> (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0)
c  in CNF:
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_2
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_1
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨  b^{63, 11}_0
c  in DIMACS:
 17717  17718  17719 -630 -17720 0
 17717  17718  17719 -630 -17721 0
 17717  17718  17719 -630  17722 0

c  1+1 --> 2
c    (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0 ∧  p_630) -> (-b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0)
c  in CNF:
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_2
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨  b^{63, 11}_1
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ -p_630 ∨ -b^{63, 11}_0
c  in DIMACS:
 17717  17718 -17719 -630 -17720 0
 17717  17718 -17719 -630  17721 0
 17717  17718 -17719 -630 -17722 0

c  2+1 --> break 
c    (-b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧  p_630) -> break
c  in CNF:
c     b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 17717 -17718  17719 -630 1162 0


c  2-1 --> 1
c    (-b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧ -p_630) -> (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0)
c  in CNF:
c     b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_2
c     b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_1
c     b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨  b^{63, 11}_0
c  in DIMACS:
 17717 -17718  17719  630 -17720 0
 17717 -17718  17719  630 -17721 0
 17717 -17718  17719  630  17722 0

c  1-1 --> 0
c    (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0 ∧ -p_630) -> (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧ -b^{63, 11}_0)
c  in CNF:
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_2
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_1
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_0
c  in DIMACS:
 17717  17718 -17719  630 -17720 0
 17717  17718 -17719  630 -17721 0
 17717  17718 -17719  630 -17722 0

c  0-1 --> -1
c    (-b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧ -p_630) -> ( b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0)
c  in CNF:
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨  b^{63, 11}_2
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_1
c     b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨  b^{63, 11}_0
c  in DIMACS:
 17717  17718  17719  630  17720 0
 17717  17718  17719  630 -17721 0
 17717  17718  17719  630  17722 0

c  -1-1 --> -2
c    ( b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧  b^{63, 10}_0 ∧ -p_630) -> ( b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0)
c  in CNF:
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨  b^{63, 11}_2
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨  b^{63, 11}_1
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨  p_630 ∨ -b^{63, 11}_0
c  in DIMACS:
-17717  17718 -17719  630  17720 0
-17717  17718 -17719  630  17721 0
-17717  17718 -17719  630 -17722 0

c  -2-1 --> break 
c    ( b^{63, 10}_2 ∧  b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨  b^{63, 10}_0 ∨  p_630 ∨ break
c  in DIMACS:
-17717 -17718  17719  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 10}_2 ∧ -b^{63, 10}_1 ∧ -b^{63, 10}_0 ∧ true) 
c  in CNF:
c    -b^{63, 10}_2 ∨  b^{63, 10}_1 ∨  b^{63, 10}_0 ∨ false 
c  in DIMACS:
-17717  17718  17719  0

c  3 does not represent an automaton state.
c    -(-b^{63, 10}_2 ∧  b^{63, 10}_1 ∧  b^{63, 10}_0 ∧ true) 
c  in CNF:
c     b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ false 
c  in DIMACS:
 17717 -17718 -17719  0
c  -3 does not represent an automaton state.
c    -( b^{63, 10}_2 ∧  b^{63, 10}_1 ∧  b^{63, 10}_0 ∧ true) 
c  in CNF:
c    -b^{63, 10}_2 ∨ -b^{63, 10}_1 ∨ -b^{63, 10}_0 ∨ false 
c  in DIMACS:
-17717 -17718 -17719  0

c i = 11
c  -2+1 --> -1
c    ( b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧  p_693) -> ( b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0)
c  in CNF:
c    -b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨  b^{63, 12}_2
c    -b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_1
c    -b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨  b^{63, 12}_0
c  in DIMACS:
-17720 -17721  17722 -693  17723 0
-17720 -17721  17722 -693 -17724 0
-17720 -17721  17722 -693  17725 0

c  -1+1 --> 0
c    ( b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0 ∧  p_693) -> (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧ -b^{63, 12}_0)
c  in CNF:
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_2
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_1
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_0
c  in DIMACS:
-17720  17721 -17722 -693 -17723 0
-17720  17721 -17722 -693 -17724 0
-17720  17721 -17722 -693 -17725 0

c  0+1 --> 1
c    (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧  p_693) -> (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0)
c  in CNF:
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_2
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_1
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨  b^{63, 12}_0
c  in DIMACS:
 17720  17721  17722 -693 -17723 0
 17720  17721  17722 -693 -17724 0
 17720  17721  17722 -693  17725 0

c  1+1 --> 2
c    (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0 ∧  p_693) -> (-b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0)
c  in CNF:
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_2
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨  b^{63, 12}_1
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ -p_693 ∨ -b^{63, 12}_0
c  in DIMACS:
 17720  17721 -17722 -693 -17723 0
 17720  17721 -17722 -693  17724 0
 17720  17721 -17722 -693 -17725 0

c  2+1 --> break 
c    (-b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧  p_693) -> break
c  in CNF:
c     b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 17720 -17721  17722 -693 1162 0


c  2-1 --> 1
c    (-b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧ -p_693) -> (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0)
c  in CNF:
c     b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_2
c     b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_1
c     b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨  b^{63, 12}_0
c  in DIMACS:
 17720 -17721  17722  693 -17723 0
 17720 -17721  17722  693 -17724 0
 17720 -17721  17722  693  17725 0

c  1-1 --> 0
c    (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0 ∧ -p_693) -> (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧ -b^{63, 12}_0)
c  in CNF:
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_2
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_1
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_0
c  in DIMACS:
 17720  17721 -17722  693 -17723 0
 17720  17721 -17722  693 -17724 0
 17720  17721 -17722  693 -17725 0

c  0-1 --> -1
c    (-b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧ -p_693) -> ( b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0)
c  in CNF:
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨  b^{63, 12}_2
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_1
c     b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨  b^{63, 12}_0
c  in DIMACS:
 17720  17721  17722  693  17723 0
 17720  17721  17722  693 -17724 0
 17720  17721  17722  693  17725 0

c  -1-1 --> -2
c    ( b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧  b^{63, 11}_0 ∧ -p_693) -> ( b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0)
c  in CNF:
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨  b^{63, 12}_2
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨  b^{63, 12}_1
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨  p_693 ∨ -b^{63, 12}_0
c  in DIMACS:
-17720  17721 -17722  693  17723 0
-17720  17721 -17722  693  17724 0
-17720  17721 -17722  693 -17725 0

c  -2-1 --> break 
c    ( b^{63, 11}_2 ∧  b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨  b^{63, 11}_0 ∨  p_693 ∨ break
c  in DIMACS:
-17720 -17721  17722  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 11}_2 ∧ -b^{63, 11}_1 ∧ -b^{63, 11}_0 ∧ true) 
c  in CNF:
c    -b^{63, 11}_2 ∨  b^{63, 11}_1 ∨  b^{63, 11}_0 ∨ false 
c  in DIMACS:
-17720  17721  17722  0

c  3 does not represent an automaton state.
c    -(-b^{63, 11}_2 ∧  b^{63, 11}_1 ∧  b^{63, 11}_0 ∧ true) 
c  in CNF:
c     b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ false 
c  in DIMACS:
 17720 -17721 -17722  0
c  -3 does not represent an automaton state.
c    -( b^{63, 11}_2 ∧  b^{63, 11}_1 ∧  b^{63, 11}_0 ∧ true) 
c  in CNF:
c    -b^{63, 11}_2 ∨ -b^{63, 11}_1 ∨ -b^{63, 11}_0 ∨ false 
c  in DIMACS:
-17720 -17721 -17722  0

c i = 12
c  -2+1 --> -1
c    ( b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧  p_756) -> ( b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0)
c  in CNF:
c    -b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨  b^{63, 13}_2
c    -b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_1
c    -b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨  b^{63, 13}_0
c  in DIMACS:
-17723 -17724  17725 -756  17726 0
-17723 -17724  17725 -756 -17727 0
-17723 -17724  17725 -756  17728 0

c  -1+1 --> 0
c    ( b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0 ∧  p_756) -> (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧ -b^{63, 13}_0)
c  in CNF:
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_2
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_1
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_0
c  in DIMACS:
-17723  17724 -17725 -756 -17726 0
-17723  17724 -17725 -756 -17727 0
-17723  17724 -17725 -756 -17728 0

c  0+1 --> 1
c    (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧  p_756) -> (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0)
c  in CNF:
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_2
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_1
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨  b^{63, 13}_0
c  in DIMACS:
 17723  17724  17725 -756 -17726 0
 17723  17724  17725 -756 -17727 0
 17723  17724  17725 -756  17728 0

c  1+1 --> 2
c    (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0 ∧  p_756) -> (-b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0)
c  in CNF:
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_2
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨  b^{63, 13}_1
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ -p_756 ∨ -b^{63, 13}_0
c  in DIMACS:
 17723  17724 -17725 -756 -17726 0
 17723  17724 -17725 -756  17727 0
 17723  17724 -17725 -756 -17728 0

c  2+1 --> break 
c    (-b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧  p_756) -> break
c  in CNF:
c     b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 17723 -17724  17725 -756 1162 0


c  2-1 --> 1
c    (-b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧ -p_756) -> (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0)
c  in CNF:
c     b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_2
c     b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_1
c     b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨  b^{63, 13}_0
c  in DIMACS:
 17723 -17724  17725  756 -17726 0
 17723 -17724  17725  756 -17727 0
 17723 -17724  17725  756  17728 0

c  1-1 --> 0
c    (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0 ∧ -p_756) -> (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧ -b^{63, 13}_0)
c  in CNF:
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_2
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_1
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_0
c  in DIMACS:
 17723  17724 -17725  756 -17726 0
 17723  17724 -17725  756 -17727 0
 17723  17724 -17725  756 -17728 0

c  0-1 --> -1
c    (-b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧ -p_756) -> ( b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0)
c  in CNF:
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨  b^{63, 13}_2
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_1
c     b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨  b^{63, 13}_0
c  in DIMACS:
 17723  17724  17725  756  17726 0
 17723  17724  17725  756 -17727 0
 17723  17724  17725  756  17728 0

c  -1-1 --> -2
c    ( b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧  b^{63, 12}_0 ∧ -p_756) -> ( b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0)
c  in CNF:
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨  b^{63, 13}_2
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨  b^{63, 13}_1
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨  p_756 ∨ -b^{63, 13}_0
c  in DIMACS:
-17723  17724 -17725  756  17726 0
-17723  17724 -17725  756  17727 0
-17723  17724 -17725  756 -17728 0

c  -2-1 --> break 
c    ( b^{63, 12}_2 ∧  b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨  b^{63, 12}_0 ∨  p_756 ∨ break
c  in DIMACS:
-17723 -17724  17725  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 12}_2 ∧ -b^{63, 12}_1 ∧ -b^{63, 12}_0 ∧ true) 
c  in CNF:
c    -b^{63, 12}_2 ∨  b^{63, 12}_1 ∨  b^{63, 12}_0 ∨ false 
c  in DIMACS:
-17723  17724  17725  0

c  3 does not represent an automaton state.
c    -(-b^{63, 12}_2 ∧  b^{63, 12}_1 ∧  b^{63, 12}_0 ∧ true) 
c  in CNF:
c     b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ false 
c  in DIMACS:
 17723 -17724 -17725  0
c  -3 does not represent an automaton state.
c    -( b^{63, 12}_2 ∧  b^{63, 12}_1 ∧  b^{63, 12}_0 ∧ true) 
c  in CNF:
c    -b^{63, 12}_2 ∨ -b^{63, 12}_1 ∨ -b^{63, 12}_0 ∨ false 
c  in DIMACS:
-17723 -17724 -17725  0

c i = 13
c  -2+1 --> -1
c    ( b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧  p_819) -> ( b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0)
c  in CNF:
c    -b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨  b^{63, 14}_2
c    -b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_1
c    -b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨  b^{63, 14}_0
c  in DIMACS:
-17726 -17727  17728 -819  17729 0
-17726 -17727  17728 -819 -17730 0
-17726 -17727  17728 -819  17731 0

c  -1+1 --> 0
c    ( b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0 ∧  p_819) -> (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧ -b^{63, 14}_0)
c  in CNF:
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_2
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_1
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_0
c  in DIMACS:
-17726  17727 -17728 -819 -17729 0
-17726  17727 -17728 -819 -17730 0
-17726  17727 -17728 -819 -17731 0

c  0+1 --> 1
c    (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧  p_819) -> (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0)
c  in CNF:
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_2
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_1
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨  b^{63, 14}_0
c  in DIMACS:
 17726  17727  17728 -819 -17729 0
 17726  17727  17728 -819 -17730 0
 17726  17727  17728 -819  17731 0

c  1+1 --> 2
c    (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0 ∧  p_819) -> (-b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0)
c  in CNF:
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_2
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨  b^{63, 14}_1
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ -p_819 ∨ -b^{63, 14}_0
c  in DIMACS:
 17726  17727 -17728 -819 -17729 0
 17726  17727 -17728 -819  17730 0
 17726  17727 -17728 -819 -17731 0

c  2+1 --> break 
c    (-b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧  p_819) -> break
c  in CNF:
c     b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 17726 -17727  17728 -819 1162 0


c  2-1 --> 1
c    (-b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧ -p_819) -> (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0)
c  in CNF:
c     b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_2
c     b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_1
c     b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨  b^{63, 14}_0
c  in DIMACS:
 17726 -17727  17728  819 -17729 0
 17726 -17727  17728  819 -17730 0
 17726 -17727  17728  819  17731 0

c  1-1 --> 0
c    (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0 ∧ -p_819) -> (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧ -b^{63, 14}_0)
c  in CNF:
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_2
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_1
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_0
c  in DIMACS:
 17726  17727 -17728  819 -17729 0
 17726  17727 -17728  819 -17730 0
 17726  17727 -17728  819 -17731 0

c  0-1 --> -1
c    (-b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧ -p_819) -> ( b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0)
c  in CNF:
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨  b^{63, 14}_2
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_1
c     b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨  b^{63, 14}_0
c  in DIMACS:
 17726  17727  17728  819  17729 0
 17726  17727  17728  819 -17730 0
 17726  17727  17728  819  17731 0

c  -1-1 --> -2
c    ( b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧  b^{63, 13}_0 ∧ -p_819) -> ( b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0)
c  in CNF:
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨  b^{63, 14}_2
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨  b^{63, 14}_1
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨  p_819 ∨ -b^{63, 14}_0
c  in DIMACS:
-17726  17727 -17728  819  17729 0
-17726  17727 -17728  819  17730 0
-17726  17727 -17728  819 -17731 0

c  -2-1 --> break 
c    ( b^{63, 13}_2 ∧  b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨  b^{63, 13}_0 ∨  p_819 ∨ break
c  in DIMACS:
-17726 -17727  17728  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 13}_2 ∧ -b^{63, 13}_1 ∧ -b^{63, 13}_0 ∧ true) 
c  in CNF:
c    -b^{63, 13}_2 ∨  b^{63, 13}_1 ∨  b^{63, 13}_0 ∨ false 
c  in DIMACS:
-17726  17727  17728  0

c  3 does not represent an automaton state.
c    -(-b^{63, 13}_2 ∧  b^{63, 13}_1 ∧  b^{63, 13}_0 ∧ true) 
c  in CNF:
c     b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ false 
c  in DIMACS:
 17726 -17727 -17728  0
c  -3 does not represent an automaton state.
c    -( b^{63, 13}_2 ∧  b^{63, 13}_1 ∧  b^{63, 13}_0 ∧ true) 
c  in CNF:
c    -b^{63, 13}_2 ∨ -b^{63, 13}_1 ∨ -b^{63, 13}_0 ∨ false 
c  in DIMACS:
-17726 -17727 -17728  0

c i = 14
c  -2+1 --> -1
c    ( b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧  p_882) -> ( b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0)
c  in CNF:
c    -b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨  b^{63, 15}_2
c    -b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_1
c    -b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨  b^{63, 15}_0
c  in DIMACS:
-17729 -17730  17731 -882  17732 0
-17729 -17730  17731 -882 -17733 0
-17729 -17730  17731 -882  17734 0

c  -1+1 --> 0
c    ( b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0 ∧  p_882) -> (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧ -b^{63, 15}_0)
c  in CNF:
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_2
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_1
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_0
c  in DIMACS:
-17729  17730 -17731 -882 -17732 0
-17729  17730 -17731 -882 -17733 0
-17729  17730 -17731 -882 -17734 0

c  0+1 --> 1
c    (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧  p_882) -> (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0)
c  in CNF:
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_2
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_1
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨  b^{63, 15}_0
c  in DIMACS:
 17729  17730  17731 -882 -17732 0
 17729  17730  17731 -882 -17733 0
 17729  17730  17731 -882  17734 0

c  1+1 --> 2
c    (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0 ∧  p_882) -> (-b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0)
c  in CNF:
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_2
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨  b^{63, 15}_1
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ -p_882 ∨ -b^{63, 15}_0
c  in DIMACS:
 17729  17730 -17731 -882 -17732 0
 17729  17730 -17731 -882  17733 0
 17729  17730 -17731 -882 -17734 0

c  2+1 --> break 
c    (-b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧  p_882) -> break
c  in CNF:
c     b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 17729 -17730  17731 -882 1162 0


c  2-1 --> 1
c    (-b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧ -p_882) -> (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0)
c  in CNF:
c     b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_2
c     b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_1
c     b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨  b^{63, 15}_0
c  in DIMACS:
 17729 -17730  17731  882 -17732 0
 17729 -17730  17731  882 -17733 0
 17729 -17730  17731  882  17734 0

c  1-1 --> 0
c    (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0 ∧ -p_882) -> (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧ -b^{63, 15}_0)
c  in CNF:
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_2
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_1
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_0
c  in DIMACS:
 17729  17730 -17731  882 -17732 0
 17729  17730 -17731  882 -17733 0
 17729  17730 -17731  882 -17734 0

c  0-1 --> -1
c    (-b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧ -p_882) -> ( b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0)
c  in CNF:
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨  b^{63, 15}_2
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_1
c     b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨  b^{63, 15}_0
c  in DIMACS:
 17729  17730  17731  882  17732 0
 17729  17730  17731  882 -17733 0
 17729  17730  17731  882  17734 0

c  -1-1 --> -2
c    ( b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧  b^{63, 14}_0 ∧ -p_882) -> ( b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0)
c  in CNF:
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨  b^{63, 15}_2
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨  b^{63, 15}_1
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨  p_882 ∨ -b^{63, 15}_0
c  in DIMACS:
-17729  17730 -17731  882  17732 0
-17729  17730 -17731  882  17733 0
-17729  17730 -17731  882 -17734 0

c  -2-1 --> break 
c    ( b^{63, 14}_2 ∧  b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨  b^{63, 14}_0 ∨  p_882 ∨ break
c  in DIMACS:
-17729 -17730  17731  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 14}_2 ∧ -b^{63, 14}_1 ∧ -b^{63, 14}_0 ∧ true) 
c  in CNF:
c    -b^{63, 14}_2 ∨  b^{63, 14}_1 ∨  b^{63, 14}_0 ∨ false 
c  in DIMACS:
-17729  17730  17731  0

c  3 does not represent an automaton state.
c    -(-b^{63, 14}_2 ∧  b^{63, 14}_1 ∧  b^{63, 14}_0 ∧ true) 
c  in CNF:
c     b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ false 
c  in DIMACS:
 17729 -17730 -17731  0
c  -3 does not represent an automaton state.
c    -( b^{63, 14}_2 ∧  b^{63, 14}_1 ∧  b^{63, 14}_0 ∧ true) 
c  in CNF:
c    -b^{63, 14}_2 ∨ -b^{63, 14}_1 ∨ -b^{63, 14}_0 ∨ false 
c  in DIMACS:
-17729 -17730 -17731  0

c i = 15
c  -2+1 --> -1
c    ( b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧  p_945) -> ( b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0)
c  in CNF:
c    -b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨  b^{63, 16}_2
c    -b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_1
c    -b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨  b^{63, 16}_0
c  in DIMACS:
-17732 -17733  17734 -945  17735 0
-17732 -17733  17734 -945 -17736 0
-17732 -17733  17734 -945  17737 0

c  -1+1 --> 0
c    ( b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0 ∧  p_945) -> (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧ -b^{63, 16}_0)
c  in CNF:
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_2
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_1
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_0
c  in DIMACS:
-17732  17733 -17734 -945 -17735 0
-17732  17733 -17734 -945 -17736 0
-17732  17733 -17734 -945 -17737 0

c  0+1 --> 1
c    (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧  p_945) -> (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0)
c  in CNF:
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_2
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_1
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨  b^{63, 16}_0
c  in DIMACS:
 17732  17733  17734 -945 -17735 0
 17732  17733  17734 -945 -17736 0
 17732  17733  17734 -945  17737 0

c  1+1 --> 2
c    (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0 ∧  p_945) -> (-b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0)
c  in CNF:
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_2
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨  b^{63, 16}_1
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ -p_945 ∨ -b^{63, 16}_0
c  in DIMACS:
 17732  17733 -17734 -945 -17735 0
 17732  17733 -17734 -945  17736 0
 17732  17733 -17734 -945 -17737 0

c  2+1 --> break 
c    (-b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧  p_945) -> break
c  in CNF:
c     b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 17732 -17733  17734 -945 1162 0


c  2-1 --> 1
c    (-b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧ -p_945) -> (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0)
c  in CNF:
c     b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_2
c     b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_1
c     b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨  b^{63, 16}_0
c  in DIMACS:
 17732 -17733  17734  945 -17735 0
 17732 -17733  17734  945 -17736 0
 17732 -17733  17734  945  17737 0

c  1-1 --> 0
c    (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0 ∧ -p_945) -> (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧ -b^{63, 16}_0)
c  in CNF:
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_2
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_1
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_0
c  in DIMACS:
 17732  17733 -17734  945 -17735 0
 17732  17733 -17734  945 -17736 0
 17732  17733 -17734  945 -17737 0

c  0-1 --> -1
c    (-b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧ -p_945) -> ( b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0)
c  in CNF:
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨  b^{63, 16}_2
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_1
c     b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨  b^{63, 16}_0
c  in DIMACS:
 17732  17733  17734  945  17735 0
 17732  17733  17734  945 -17736 0
 17732  17733  17734  945  17737 0

c  -1-1 --> -2
c    ( b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧  b^{63, 15}_0 ∧ -p_945) -> ( b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0)
c  in CNF:
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨  b^{63, 16}_2
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨  b^{63, 16}_1
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨  p_945 ∨ -b^{63, 16}_0
c  in DIMACS:
-17732  17733 -17734  945  17735 0
-17732  17733 -17734  945  17736 0
-17732  17733 -17734  945 -17737 0

c  -2-1 --> break 
c    ( b^{63, 15}_2 ∧  b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨  b^{63, 15}_0 ∨  p_945 ∨ break
c  in DIMACS:
-17732 -17733  17734  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 15}_2 ∧ -b^{63, 15}_1 ∧ -b^{63, 15}_0 ∧ true) 
c  in CNF:
c    -b^{63, 15}_2 ∨  b^{63, 15}_1 ∨  b^{63, 15}_0 ∨ false 
c  in DIMACS:
-17732  17733  17734  0

c  3 does not represent an automaton state.
c    -(-b^{63, 15}_2 ∧  b^{63, 15}_1 ∧  b^{63, 15}_0 ∧ true) 
c  in CNF:
c     b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ false 
c  in DIMACS:
 17732 -17733 -17734  0
c  -3 does not represent an automaton state.
c    -( b^{63, 15}_2 ∧  b^{63, 15}_1 ∧  b^{63, 15}_0 ∧ true) 
c  in CNF:
c    -b^{63, 15}_2 ∨ -b^{63, 15}_1 ∨ -b^{63, 15}_0 ∨ false 
c  in DIMACS:
-17732 -17733 -17734  0

c i = 16
c  -2+1 --> -1
c    ( b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧  p_1008) -> ( b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0)
c  in CNF:
c    -b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨  b^{63, 17}_2
c    -b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_1
c    -b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨  b^{63, 17}_0
c  in DIMACS:
-17735 -17736  17737 -1008  17738 0
-17735 -17736  17737 -1008 -17739 0
-17735 -17736  17737 -1008  17740 0

c  -1+1 --> 0
c    ( b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0 ∧  p_1008) -> (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧ -b^{63, 17}_0)
c  in CNF:
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_2
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_1
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_0
c  in DIMACS:
-17735  17736 -17737 -1008 -17738 0
-17735  17736 -17737 -1008 -17739 0
-17735  17736 -17737 -1008 -17740 0

c  0+1 --> 1
c    (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧  p_1008) -> (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0)
c  in CNF:
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_2
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_1
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨  b^{63, 17}_0
c  in DIMACS:
 17735  17736  17737 -1008 -17738 0
 17735  17736  17737 -1008 -17739 0
 17735  17736  17737 -1008  17740 0

c  1+1 --> 2
c    (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0 ∧  p_1008) -> (-b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0)
c  in CNF:
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_2
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨  b^{63, 17}_1
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ -p_1008 ∨ -b^{63, 17}_0
c  in DIMACS:
 17735  17736 -17737 -1008 -17738 0
 17735  17736 -17737 -1008  17739 0
 17735  17736 -17737 -1008 -17740 0

c  2+1 --> break 
c    (-b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 17735 -17736  17737 -1008 1162 0


c  2-1 --> 1
c    (-b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧ -p_1008) -> (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0)
c  in CNF:
c     b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_2
c     b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_1
c     b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨  b^{63, 17}_0
c  in DIMACS:
 17735 -17736  17737  1008 -17738 0
 17735 -17736  17737  1008 -17739 0
 17735 -17736  17737  1008  17740 0

c  1-1 --> 0
c    (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0 ∧ -p_1008) -> (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧ -b^{63, 17}_0)
c  in CNF:
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_2
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_1
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_0
c  in DIMACS:
 17735  17736 -17737  1008 -17738 0
 17735  17736 -17737  1008 -17739 0
 17735  17736 -17737  1008 -17740 0

c  0-1 --> -1
c    (-b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧ -p_1008) -> ( b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0)
c  in CNF:
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨  b^{63, 17}_2
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_1
c     b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨  b^{63, 17}_0
c  in DIMACS:
 17735  17736  17737  1008  17738 0
 17735  17736  17737  1008 -17739 0
 17735  17736  17737  1008  17740 0

c  -1-1 --> -2
c    ( b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧  b^{63, 16}_0 ∧ -p_1008) -> ( b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0)
c  in CNF:
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨  b^{63, 17}_2
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨  b^{63, 17}_1
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨  p_1008 ∨ -b^{63, 17}_0
c  in DIMACS:
-17735  17736 -17737  1008  17738 0
-17735  17736 -17737  1008  17739 0
-17735  17736 -17737  1008 -17740 0

c  -2-1 --> break 
c    ( b^{63, 16}_2 ∧  b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨  b^{63, 16}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-17735 -17736  17737  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 16}_2 ∧ -b^{63, 16}_1 ∧ -b^{63, 16}_0 ∧ true) 
c  in CNF:
c    -b^{63, 16}_2 ∨  b^{63, 16}_1 ∨  b^{63, 16}_0 ∨ false 
c  in DIMACS:
-17735  17736  17737  0

c  3 does not represent an automaton state.
c    -(-b^{63, 16}_2 ∧  b^{63, 16}_1 ∧  b^{63, 16}_0 ∧ true) 
c  in CNF:
c     b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ false 
c  in DIMACS:
 17735 -17736 -17737  0
c  -3 does not represent an automaton state.
c    -( b^{63, 16}_2 ∧  b^{63, 16}_1 ∧  b^{63, 16}_0 ∧ true) 
c  in CNF:
c    -b^{63, 16}_2 ∨ -b^{63, 16}_1 ∨ -b^{63, 16}_0 ∨ false 
c  in DIMACS:
-17735 -17736 -17737  0

c i = 17
c  -2+1 --> -1
c    ( b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧  p_1071) -> ( b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0)
c  in CNF:
c    -b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨  b^{63, 18}_2
c    -b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_1
c    -b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨  b^{63, 18}_0
c  in DIMACS:
-17738 -17739  17740 -1071  17741 0
-17738 -17739  17740 -1071 -17742 0
-17738 -17739  17740 -1071  17743 0

c  -1+1 --> 0
c    ( b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0 ∧  p_1071) -> (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧ -b^{63, 18}_0)
c  in CNF:
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_2
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_1
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_0
c  in DIMACS:
-17738  17739 -17740 -1071 -17741 0
-17738  17739 -17740 -1071 -17742 0
-17738  17739 -17740 -1071 -17743 0

c  0+1 --> 1
c    (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧  p_1071) -> (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0)
c  in CNF:
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_2
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_1
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨  b^{63, 18}_0
c  in DIMACS:
 17738  17739  17740 -1071 -17741 0
 17738  17739  17740 -1071 -17742 0
 17738  17739  17740 -1071  17743 0

c  1+1 --> 2
c    (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0 ∧  p_1071) -> (-b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0)
c  in CNF:
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_2
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨  b^{63, 18}_1
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ -p_1071 ∨ -b^{63, 18}_0
c  in DIMACS:
 17738  17739 -17740 -1071 -17741 0
 17738  17739 -17740 -1071  17742 0
 17738  17739 -17740 -1071 -17743 0

c  2+1 --> break 
c    (-b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 17738 -17739  17740 -1071 1162 0


c  2-1 --> 1
c    (-b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧ -p_1071) -> (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0)
c  in CNF:
c     b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_2
c     b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_1
c     b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨  b^{63, 18}_0
c  in DIMACS:
 17738 -17739  17740  1071 -17741 0
 17738 -17739  17740  1071 -17742 0
 17738 -17739  17740  1071  17743 0

c  1-1 --> 0
c    (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0 ∧ -p_1071) -> (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧ -b^{63, 18}_0)
c  in CNF:
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_2
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_1
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_0
c  in DIMACS:
 17738  17739 -17740  1071 -17741 0
 17738  17739 -17740  1071 -17742 0
 17738  17739 -17740  1071 -17743 0

c  0-1 --> -1
c    (-b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧ -p_1071) -> ( b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0)
c  in CNF:
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨  b^{63, 18}_2
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_1
c     b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨  b^{63, 18}_0
c  in DIMACS:
 17738  17739  17740  1071  17741 0
 17738  17739  17740  1071 -17742 0
 17738  17739  17740  1071  17743 0

c  -1-1 --> -2
c    ( b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧  b^{63, 17}_0 ∧ -p_1071) -> ( b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0)
c  in CNF:
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨  b^{63, 18}_2
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨  b^{63, 18}_1
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨  p_1071 ∨ -b^{63, 18}_0
c  in DIMACS:
-17738  17739 -17740  1071  17741 0
-17738  17739 -17740  1071  17742 0
-17738  17739 -17740  1071 -17743 0

c  -2-1 --> break 
c    ( b^{63, 17}_2 ∧  b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨  b^{63, 17}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-17738 -17739  17740  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 17}_2 ∧ -b^{63, 17}_1 ∧ -b^{63, 17}_0 ∧ true) 
c  in CNF:
c    -b^{63, 17}_2 ∨  b^{63, 17}_1 ∨  b^{63, 17}_0 ∨ false 
c  in DIMACS:
-17738  17739  17740  0

c  3 does not represent an automaton state.
c    -(-b^{63, 17}_2 ∧  b^{63, 17}_1 ∧  b^{63, 17}_0 ∧ true) 
c  in CNF:
c     b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ false 
c  in DIMACS:
 17738 -17739 -17740  0
c  -3 does not represent an automaton state.
c    -( b^{63, 17}_2 ∧  b^{63, 17}_1 ∧  b^{63, 17}_0 ∧ true) 
c  in CNF:
c    -b^{63, 17}_2 ∨ -b^{63, 17}_1 ∨ -b^{63, 17}_0 ∨ false 
c  in DIMACS:
-17738 -17739 -17740  0

c i = 18
c  -2+1 --> -1
c    ( b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧  p_1134) -> ( b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧  b^{63, 19}_0)
c  in CNF:
c    -b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨  b^{63, 19}_2
c    -b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_1
c    -b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨  b^{63, 19}_0
c  in DIMACS:
-17741 -17742  17743 -1134  17744 0
-17741 -17742  17743 -1134 -17745 0
-17741 -17742  17743 -1134  17746 0

c  -1+1 --> 0
c    ( b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0 ∧  p_1134) -> (-b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧ -b^{63, 19}_0)
c  in CNF:
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_2
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_1
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_0
c  in DIMACS:
-17741  17742 -17743 -1134 -17744 0
-17741  17742 -17743 -1134 -17745 0
-17741  17742 -17743 -1134 -17746 0

c  0+1 --> 1
c    (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧  p_1134) -> (-b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧  b^{63, 19}_0)
c  in CNF:
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_2
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_1
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨  b^{63, 19}_0
c  in DIMACS:
 17741  17742  17743 -1134 -17744 0
 17741  17742  17743 -1134 -17745 0
 17741  17742  17743 -1134  17746 0

c  1+1 --> 2
c    (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0 ∧  p_1134) -> (-b^{63, 19}_2 ∧  b^{63, 19}_1 ∧ -b^{63, 19}_0)
c  in CNF:
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_2
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨  b^{63, 19}_1
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ -p_1134 ∨ -b^{63, 19}_0
c  in DIMACS:
 17741  17742 -17743 -1134 -17744 0
 17741  17742 -17743 -1134  17745 0
 17741  17742 -17743 -1134 -17746 0

c  2+1 --> break 
c    (-b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 17741 -17742  17743 -1134 1162 0


c  2-1 --> 1
c    (-b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧ -p_1134) -> (-b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧  b^{63, 19}_0)
c  in CNF:
c     b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_2
c     b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_1
c     b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨  b^{63, 19}_0
c  in DIMACS:
 17741 -17742  17743  1134 -17744 0
 17741 -17742  17743  1134 -17745 0
 17741 -17742  17743  1134  17746 0

c  1-1 --> 0
c    (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0 ∧ -p_1134) -> (-b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧ -b^{63, 19}_0)
c  in CNF:
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_2
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_1
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_0
c  in DIMACS:
 17741  17742 -17743  1134 -17744 0
 17741  17742 -17743  1134 -17745 0
 17741  17742 -17743  1134 -17746 0

c  0-1 --> -1
c    (-b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧ -p_1134) -> ( b^{63, 19}_2 ∧ -b^{63, 19}_1 ∧  b^{63, 19}_0)
c  in CNF:
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨  b^{63, 19}_2
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_1
c     b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨  b^{63, 19}_0
c  in DIMACS:
 17741  17742  17743  1134  17744 0
 17741  17742  17743  1134 -17745 0
 17741  17742  17743  1134  17746 0

c  -1-1 --> -2
c    ( b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧  b^{63, 18}_0 ∧ -p_1134) -> ( b^{63, 19}_2 ∧  b^{63, 19}_1 ∧ -b^{63, 19}_0)
c  in CNF:
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨  b^{63, 19}_2
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨  b^{63, 19}_1
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨  p_1134 ∨ -b^{63, 19}_0
c  in DIMACS:
-17741  17742 -17743  1134  17744 0
-17741  17742 -17743  1134  17745 0
-17741  17742 -17743  1134 -17746 0

c  -2-1 --> break 
c    ( b^{63, 18}_2 ∧  b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨  b^{63, 18}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-17741 -17742  17743  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{63, 18}_2 ∧ -b^{63, 18}_1 ∧ -b^{63, 18}_0 ∧ true) 
c  in CNF:
c    -b^{63, 18}_2 ∨  b^{63, 18}_1 ∨  b^{63, 18}_0 ∨ false 
c  in DIMACS:
-17741  17742  17743  0

c  3 does not represent an automaton state.
c    -(-b^{63, 18}_2 ∧  b^{63, 18}_1 ∧  b^{63, 18}_0 ∧ true) 
c  in CNF:
c     b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ false 
c  in DIMACS:
 17741 -17742 -17743  0
c  -3 does not represent an automaton state.
c    -( b^{63, 18}_2 ∧  b^{63, 18}_1 ∧  b^{63, 18}_0 ∧ true) 
c  in CNF:
c    -b^{63, 18}_2 ∨ -b^{63, 18}_1 ∨ -b^{63, 18}_0 ∨ false 
c  in DIMACS:
-17741 -17742 -17743  0

c INIT for k = 64
c    -b^{64, 1}_2
c    -b^{64, 1}_1
c    -b^{64, 1}_0
c  in DIMACS:
-17747 0
-17748 0
-17749 0

c Transitions for k = 64
c i = 1
c  -2+1 --> -1
c    ( b^{64, 1}_2 ∧  b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧  p_64) -> ( b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0)
c  in CNF:
c    -b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨  b^{64, 2}_2
c    -b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_1
c    -b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨  b^{64, 2}_0
c  in DIMACS:
-17747 -17748  17749 -64  17750 0
-17747 -17748  17749 -64 -17751 0
-17747 -17748  17749 -64  17752 0

c  -1+1 --> 0
c    ( b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧  b^{64, 1}_0 ∧  p_64) -> (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧ -b^{64, 2}_0)
c  in CNF:
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_2
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_1
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_0
c  in DIMACS:
-17747  17748 -17749 -64 -17750 0
-17747  17748 -17749 -64 -17751 0
-17747  17748 -17749 -64 -17752 0

c  0+1 --> 1
c    (-b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧  p_64) -> (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0)
c  in CNF:
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_2
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_1
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨  b^{64, 2}_0
c  in DIMACS:
 17747  17748  17749 -64 -17750 0
 17747  17748  17749 -64 -17751 0
 17747  17748  17749 -64  17752 0

c  1+1 --> 2
c    (-b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧  b^{64, 1}_0 ∧  p_64) -> (-b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0)
c  in CNF:
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_2
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨  b^{64, 2}_1
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ -p_64 ∨ -b^{64, 2}_0
c  in DIMACS:
 17747  17748 -17749 -64 -17750 0
 17747  17748 -17749 -64  17751 0
 17747  17748 -17749 -64 -17752 0

c  2+1 --> break 
c    (-b^{64, 1}_2 ∧  b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧  p_64) -> break
c  in CNF:
c     b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ -p_64 ∨ break
c  in DIMACS:
 17747 -17748  17749 -64 1162 0


c  2-1 --> 1
c    (-b^{64, 1}_2 ∧  b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧ -p_64) -> (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0)
c  in CNF:
c     b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_2
c     b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_1
c     b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨  b^{64, 2}_0
c  in DIMACS:
 17747 -17748  17749  64 -17750 0
 17747 -17748  17749  64 -17751 0
 17747 -17748  17749  64  17752 0

c  1-1 --> 0
c    (-b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧  b^{64, 1}_0 ∧ -p_64) -> (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧ -b^{64, 2}_0)
c  in CNF:
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_2
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_1
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_0
c  in DIMACS:
 17747  17748 -17749  64 -17750 0
 17747  17748 -17749  64 -17751 0
 17747  17748 -17749  64 -17752 0

c  0-1 --> -1
c    (-b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧ -p_64) -> ( b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0)
c  in CNF:
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨  b^{64, 2}_2
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_1
c     b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨  b^{64, 2}_0
c  in DIMACS:
 17747  17748  17749  64  17750 0
 17747  17748  17749  64 -17751 0
 17747  17748  17749  64  17752 0

c  -1-1 --> -2
c    ( b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧  b^{64, 1}_0 ∧ -p_64) -> ( b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0)
c  in CNF:
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨  b^{64, 2}_2
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨  b^{64, 2}_1
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨  p_64 ∨ -b^{64, 2}_0
c  in DIMACS:
-17747  17748 -17749  64  17750 0
-17747  17748 -17749  64  17751 0
-17747  17748 -17749  64 -17752 0

c  -2-1 --> break 
c    ( b^{64, 1}_2 ∧  b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧ -p_64) -> break
c  in CNF:
c    -b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨  b^{64, 1}_0 ∨  p_64 ∨ break
c  in DIMACS:
-17747 -17748  17749  64 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 1}_2 ∧ -b^{64, 1}_1 ∧ -b^{64, 1}_0 ∧ true) 
c  in CNF:
c    -b^{64, 1}_2 ∨  b^{64, 1}_1 ∨  b^{64, 1}_0 ∨ false 
c  in DIMACS:
-17747  17748  17749  0

c  3 does not represent an automaton state.
c    -(-b^{64, 1}_2 ∧  b^{64, 1}_1 ∧  b^{64, 1}_0 ∧ true) 
c  in CNF:
c     b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ false 
c  in DIMACS:
 17747 -17748 -17749  0
c  -3 does not represent an automaton state.
c    -( b^{64, 1}_2 ∧  b^{64, 1}_1 ∧  b^{64, 1}_0 ∧ true) 
c  in CNF:
c    -b^{64, 1}_2 ∨ -b^{64, 1}_1 ∨ -b^{64, 1}_0 ∨ false 
c  in DIMACS:
-17747 -17748 -17749  0

c i = 2
c  -2+1 --> -1
c    ( b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧  p_128) -> ( b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0)
c  in CNF:
c    -b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨  b^{64, 3}_2
c    -b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_1
c    -b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨  b^{64, 3}_0
c  in DIMACS:
-17750 -17751  17752 -128  17753 0
-17750 -17751  17752 -128 -17754 0
-17750 -17751  17752 -128  17755 0

c  -1+1 --> 0
c    ( b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0 ∧  p_128) -> (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧ -b^{64, 3}_0)
c  in CNF:
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_2
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_1
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_0
c  in DIMACS:
-17750  17751 -17752 -128 -17753 0
-17750  17751 -17752 -128 -17754 0
-17750  17751 -17752 -128 -17755 0

c  0+1 --> 1
c    (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧  p_128) -> (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0)
c  in CNF:
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_2
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_1
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨  b^{64, 3}_0
c  in DIMACS:
 17750  17751  17752 -128 -17753 0
 17750  17751  17752 -128 -17754 0
 17750  17751  17752 -128  17755 0

c  1+1 --> 2
c    (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0 ∧  p_128) -> (-b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0)
c  in CNF:
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_2
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨  b^{64, 3}_1
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ -p_128 ∨ -b^{64, 3}_0
c  in DIMACS:
 17750  17751 -17752 -128 -17753 0
 17750  17751 -17752 -128  17754 0
 17750  17751 -17752 -128 -17755 0

c  2+1 --> break 
c    (-b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧  p_128) -> break
c  in CNF:
c     b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 17750 -17751  17752 -128 1162 0


c  2-1 --> 1
c    (-b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧ -p_128) -> (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0)
c  in CNF:
c     b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_2
c     b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_1
c     b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨  b^{64, 3}_0
c  in DIMACS:
 17750 -17751  17752  128 -17753 0
 17750 -17751  17752  128 -17754 0
 17750 -17751  17752  128  17755 0

c  1-1 --> 0
c    (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0 ∧ -p_128) -> (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧ -b^{64, 3}_0)
c  in CNF:
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_2
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_1
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_0
c  in DIMACS:
 17750  17751 -17752  128 -17753 0
 17750  17751 -17752  128 -17754 0
 17750  17751 -17752  128 -17755 0

c  0-1 --> -1
c    (-b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧ -p_128) -> ( b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0)
c  in CNF:
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨  b^{64, 3}_2
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_1
c     b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨  b^{64, 3}_0
c  in DIMACS:
 17750  17751  17752  128  17753 0
 17750  17751  17752  128 -17754 0
 17750  17751  17752  128  17755 0

c  -1-1 --> -2
c    ( b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧  b^{64, 2}_0 ∧ -p_128) -> ( b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0)
c  in CNF:
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨  b^{64, 3}_2
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨  b^{64, 3}_1
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨  p_128 ∨ -b^{64, 3}_0
c  in DIMACS:
-17750  17751 -17752  128  17753 0
-17750  17751 -17752  128  17754 0
-17750  17751 -17752  128 -17755 0

c  -2-1 --> break 
c    ( b^{64, 2}_2 ∧  b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨  b^{64, 2}_0 ∨  p_128 ∨ break
c  in DIMACS:
-17750 -17751  17752  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 2}_2 ∧ -b^{64, 2}_1 ∧ -b^{64, 2}_0 ∧ true) 
c  in CNF:
c    -b^{64, 2}_2 ∨  b^{64, 2}_1 ∨  b^{64, 2}_0 ∨ false 
c  in DIMACS:
-17750  17751  17752  0

c  3 does not represent an automaton state.
c    -(-b^{64, 2}_2 ∧  b^{64, 2}_1 ∧  b^{64, 2}_0 ∧ true) 
c  in CNF:
c     b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ false 
c  in DIMACS:
 17750 -17751 -17752  0
c  -3 does not represent an automaton state.
c    -( b^{64, 2}_2 ∧  b^{64, 2}_1 ∧  b^{64, 2}_0 ∧ true) 
c  in CNF:
c    -b^{64, 2}_2 ∨ -b^{64, 2}_1 ∨ -b^{64, 2}_0 ∨ false 
c  in DIMACS:
-17750 -17751 -17752  0

c i = 3
c  -2+1 --> -1
c    ( b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧  p_192) -> ( b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0)
c  in CNF:
c    -b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨  b^{64, 4}_2
c    -b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_1
c    -b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨  b^{64, 4}_0
c  in DIMACS:
-17753 -17754  17755 -192  17756 0
-17753 -17754  17755 -192 -17757 0
-17753 -17754  17755 -192  17758 0

c  -1+1 --> 0
c    ( b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0 ∧  p_192) -> (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧ -b^{64, 4}_0)
c  in CNF:
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_2
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_1
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_0
c  in DIMACS:
-17753  17754 -17755 -192 -17756 0
-17753  17754 -17755 -192 -17757 0
-17753  17754 -17755 -192 -17758 0

c  0+1 --> 1
c    (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧  p_192) -> (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0)
c  in CNF:
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_2
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_1
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨  b^{64, 4}_0
c  in DIMACS:
 17753  17754  17755 -192 -17756 0
 17753  17754  17755 -192 -17757 0
 17753  17754  17755 -192  17758 0

c  1+1 --> 2
c    (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0 ∧  p_192) -> (-b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0)
c  in CNF:
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_2
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨  b^{64, 4}_1
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ -p_192 ∨ -b^{64, 4}_0
c  in DIMACS:
 17753  17754 -17755 -192 -17756 0
 17753  17754 -17755 -192  17757 0
 17753  17754 -17755 -192 -17758 0

c  2+1 --> break 
c    (-b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧  p_192) -> break
c  in CNF:
c     b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 17753 -17754  17755 -192 1162 0


c  2-1 --> 1
c    (-b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧ -p_192) -> (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0)
c  in CNF:
c     b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_2
c     b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_1
c     b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨  b^{64, 4}_0
c  in DIMACS:
 17753 -17754  17755  192 -17756 0
 17753 -17754  17755  192 -17757 0
 17753 -17754  17755  192  17758 0

c  1-1 --> 0
c    (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0 ∧ -p_192) -> (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧ -b^{64, 4}_0)
c  in CNF:
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_2
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_1
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_0
c  in DIMACS:
 17753  17754 -17755  192 -17756 0
 17753  17754 -17755  192 -17757 0
 17753  17754 -17755  192 -17758 0

c  0-1 --> -1
c    (-b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧ -p_192) -> ( b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0)
c  in CNF:
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨  b^{64, 4}_2
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_1
c     b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨  b^{64, 4}_0
c  in DIMACS:
 17753  17754  17755  192  17756 0
 17753  17754  17755  192 -17757 0
 17753  17754  17755  192  17758 0

c  -1-1 --> -2
c    ( b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧  b^{64, 3}_0 ∧ -p_192) -> ( b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0)
c  in CNF:
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨  b^{64, 4}_2
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨  b^{64, 4}_1
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨  p_192 ∨ -b^{64, 4}_0
c  in DIMACS:
-17753  17754 -17755  192  17756 0
-17753  17754 -17755  192  17757 0
-17753  17754 -17755  192 -17758 0

c  -2-1 --> break 
c    ( b^{64, 3}_2 ∧  b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨  b^{64, 3}_0 ∨  p_192 ∨ break
c  in DIMACS:
-17753 -17754  17755  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 3}_2 ∧ -b^{64, 3}_1 ∧ -b^{64, 3}_0 ∧ true) 
c  in CNF:
c    -b^{64, 3}_2 ∨  b^{64, 3}_1 ∨  b^{64, 3}_0 ∨ false 
c  in DIMACS:
-17753  17754  17755  0

c  3 does not represent an automaton state.
c    -(-b^{64, 3}_2 ∧  b^{64, 3}_1 ∧  b^{64, 3}_0 ∧ true) 
c  in CNF:
c     b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ false 
c  in DIMACS:
 17753 -17754 -17755  0
c  -3 does not represent an automaton state.
c    -( b^{64, 3}_2 ∧  b^{64, 3}_1 ∧  b^{64, 3}_0 ∧ true) 
c  in CNF:
c    -b^{64, 3}_2 ∨ -b^{64, 3}_1 ∨ -b^{64, 3}_0 ∨ false 
c  in DIMACS:
-17753 -17754 -17755  0

c i = 4
c  -2+1 --> -1
c    ( b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧  p_256) -> ( b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0)
c  in CNF:
c    -b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨  b^{64, 5}_2
c    -b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_1
c    -b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨  b^{64, 5}_0
c  in DIMACS:
-17756 -17757  17758 -256  17759 0
-17756 -17757  17758 -256 -17760 0
-17756 -17757  17758 -256  17761 0

c  -1+1 --> 0
c    ( b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0 ∧  p_256) -> (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧ -b^{64, 5}_0)
c  in CNF:
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_2
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_1
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_0
c  in DIMACS:
-17756  17757 -17758 -256 -17759 0
-17756  17757 -17758 -256 -17760 0
-17756  17757 -17758 -256 -17761 0

c  0+1 --> 1
c    (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧  p_256) -> (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0)
c  in CNF:
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_2
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_1
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨  b^{64, 5}_0
c  in DIMACS:
 17756  17757  17758 -256 -17759 0
 17756  17757  17758 -256 -17760 0
 17756  17757  17758 -256  17761 0

c  1+1 --> 2
c    (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0 ∧  p_256) -> (-b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0)
c  in CNF:
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_2
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨  b^{64, 5}_1
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ -p_256 ∨ -b^{64, 5}_0
c  in DIMACS:
 17756  17757 -17758 -256 -17759 0
 17756  17757 -17758 -256  17760 0
 17756  17757 -17758 -256 -17761 0

c  2+1 --> break 
c    (-b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧  p_256) -> break
c  in CNF:
c     b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 17756 -17757  17758 -256 1162 0


c  2-1 --> 1
c    (-b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧ -p_256) -> (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0)
c  in CNF:
c     b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_2
c     b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_1
c     b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨  b^{64, 5}_0
c  in DIMACS:
 17756 -17757  17758  256 -17759 0
 17756 -17757  17758  256 -17760 0
 17756 -17757  17758  256  17761 0

c  1-1 --> 0
c    (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0 ∧ -p_256) -> (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧ -b^{64, 5}_0)
c  in CNF:
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_2
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_1
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_0
c  in DIMACS:
 17756  17757 -17758  256 -17759 0
 17756  17757 -17758  256 -17760 0
 17756  17757 -17758  256 -17761 0

c  0-1 --> -1
c    (-b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧ -p_256) -> ( b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0)
c  in CNF:
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨  b^{64, 5}_2
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_1
c     b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨  b^{64, 5}_0
c  in DIMACS:
 17756  17757  17758  256  17759 0
 17756  17757  17758  256 -17760 0
 17756  17757  17758  256  17761 0

c  -1-1 --> -2
c    ( b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧  b^{64, 4}_0 ∧ -p_256) -> ( b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0)
c  in CNF:
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨  b^{64, 5}_2
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨  b^{64, 5}_1
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨  p_256 ∨ -b^{64, 5}_0
c  in DIMACS:
-17756  17757 -17758  256  17759 0
-17756  17757 -17758  256  17760 0
-17756  17757 -17758  256 -17761 0

c  -2-1 --> break 
c    ( b^{64, 4}_2 ∧  b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨  b^{64, 4}_0 ∨  p_256 ∨ break
c  in DIMACS:
-17756 -17757  17758  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 4}_2 ∧ -b^{64, 4}_1 ∧ -b^{64, 4}_0 ∧ true) 
c  in CNF:
c    -b^{64, 4}_2 ∨  b^{64, 4}_1 ∨  b^{64, 4}_0 ∨ false 
c  in DIMACS:
-17756  17757  17758  0

c  3 does not represent an automaton state.
c    -(-b^{64, 4}_2 ∧  b^{64, 4}_1 ∧  b^{64, 4}_0 ∧ true) 
c  in CNF:
c     b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ false 
c  in DIMACS:
 17756 -17757 -17758  0
c  -3 does not represent an automaton state.
c    -( b^{64, 4}_2 ∧  b^{64, 4}_1 ∧  b^{64, 4}_0 ∧ true) 
c  in CNF:
c    -b^{64, 4}_2 ∨ -b^{64, 4}_1 ∨ -b^{64, 4}_0 ∨ false 
c  in DIMACS:
-17756 -17757 -17758  0

c i = 5
c  -2+1 --> -1
c    ( b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧  p_320) -> ( b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0)
c  in CNF:
c    -b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨  b^{64, 6}_2
c    -b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_1
c    -b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨  b^{64, 6}_0
c  in DIMACS:
-17759 -17760  17761 -320  17762 0
-17759 -17760  17761 -320 -17763 0
-17759 -17760  17761 -320  17764 0

c  -1+1 --> 0
c    ( b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0 ∧  p_320) -> (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧ -b^{64, 6}_0)
c  in CNF:
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_2
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_1
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_0
c  in DIMACS:
-17759  17760 -17761 -320 -17762 0
-17759  17760 -17761 -320 -17763 0
-17759  17760 -17761 -320 -17764 0

c  0+1 --> 1
c    (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧  p_320) -> (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0)
c  in CNF:
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_2
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_1
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨  b^{64, 6}_0
c  in DIMACS:
 17759  17760  17761 -320 -17762 0
 17759  17760  17761 -320 -17763 0
 17759  17760  17761 -320  17764 0

c  1+1 --> 2
c    (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0 ∧  p_320) -> (-b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0)
c  in CNF:
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_2
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨  b^{64, 6}_1
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ -p_320 ∨ -b^{64, 6}_0
c  in DIMACS:
 17759  17760 -17761 -320 -17762 0
 17759  17760 -17761 -320  17763 0
 17759  17760 -17761 -320 -17764 0

c  2+1 --> break 
c    (-b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧  p_320) -> break
c  in CNF:
c     b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 17759 -17760  17761 -320 1162 0


c  2-1 --> 1
c    (-b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧ -p_320) -> (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0)
c  in CNF:
c     b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_2
c     b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_1
c     b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨  b^{64, 6}_0
c  in DIMACS:
 17759 -17760  17761  320 -17762 0
 17759 -17760  17761  320 -17763 0
 17759 -17760  17761  320  17764 0

c  1-1 --> 0
c    (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0 ∧ -p_320) -> (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧ -b^{64, 6}_0)
c  in CNF:
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_2
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_1
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_0
c  in DIMACS:
 17759  17760 -17761  320 -17762 0
 17759  17760 -17761  320 -17763 0
 17759  17760 -17761  320 -17764 0

c  0-1 --> -1
c    (-b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧ -p_320) -> ( b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0)
c  in CNF:
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨  b^{64, 6}_2
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_1
c     b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨  b^{64, 6}_0
c  in DIMACS:
 17759  17760  17761  320  17762 0
 17759  17760  17761  320 -17763 0
 17759  17760  17761  320  17764 0

c  -1-1 --> -2
c    ( b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧  b^{64, 5}_0 ∧ -p_320) -> ( b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0)
c  in CNF:
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨  b^{64, 6}_2
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨  b^{64, 6}_1
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨  p_320 ∨ -b^{64, 6}_0
c  in DIMACS:
-17759  17760 -17761  320  17762 0
-17759  17760 -17761  320  17763 0
-17759  17760 -17761  320 -17764 0

c  -2-1 --> break 
c    ( b^{64, 5}_2 ∧  b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨  b^{64, 5}_0 ∨  p_320 ∨ break
c  in DIMACS:
-17759 -17760  17761  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 5}_2 ∧ -b^{64, 5}_1 ∧ -b^{64, 5}_0 ∧ true) 
c  in CNF:
c    -b^{64, 5}_2 ∨  b^{64, 5}_1 ∨  b^{64, 5}_0 ∨ false 
c  in DIMACS:
-17759  17760  17761  0

c  3 does not represent an automaton state.
c    -(-b^{64, 5}_2 ∧  b^{64, 5}_1 ∧  b^{64, 5}_0 ∧ true) 
c  in CNF:
c     b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ false 
c  in DIMACS:
 17759 -17760 -17761  0
c  -3 does not represent an automaton state.
c    -( b^{64, 5}_2 ∧  b^{64, 5}_1 ∧  b^{64, 5}_0 ∧ true) 
c  in CNF:
c    -b^{64, 5}_2 ∨ -b^{64, 5}_1 ∨ -b^{64, 5}_0 ∨ false 
c  in DIMACS:
-17759 -17760 -17761  0

c i = 6
c  -2+1 --> -1
c    ( b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧  p_384) -> ( b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0)
c  in CNF:
c    -b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨  b^{64, 7}_2
c    -b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_1
c    -b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨  b^{64, 7}_0
c  in DIMACS:
-17762 -17763  17764 -384  17765 0
-17762 -17763  17764 -384 -17766 0
-17762 -17763  17764 -384  17767 0

c  -1+1 --> 0
c    ( b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0 ∧  p_384) -> (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧ -b^{64, 7}_0)
c  in CNF:
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_2
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_1
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_0
c  in DIMACS:
-17762  17763 -17764 -384 -17765 0
-17762  17763 -17764 -384 -17766 0
-17762  17763 -17764 -384 -17767 0

c  0+1 --> 1
c    (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧  p_384) -> (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0)
c  in CNF:
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_2
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_1
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨  b^{64, 7}_0
c  in DIMACS:
 17762  17763  17764 -384 -17765 0
 17762  17763  17764 -384 -17766 0
 17762  17763  17764 -384  17767 0

c  1+1 --> 2
c    (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0 ∧  p_384) -> (-b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0)
c  in CNF:
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_2
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨  b^{64, 7}_1
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ -p_384 ∨ -b^{64, 7}_0
c  in DIMACS:
 17762  17763 -17764 -384 -17765 0
 17762  17763 -17764 -384  17766 0
 17762  17763 -17764 -384 -17767 0

c  2+1 --> break 
c    (-b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧  p_384) -> break
c  in CNF:
c     b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 17762 -17763  17764 -384 1162 0


c  2-1 --> 1
c    (-b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧ -p_384) -> (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0)
c  in CNF:
c     b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_2
c     b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_1
c     b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨  b^{64, 7}_0
c  in DIMACS:
 17762 -17763  17764  384 -17765 0
 17762 -17763  17764  384 -17766 0
 17762 -17763  17764  384  17767 0

c  1-1 --> 0
c    (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0 ∧ -p_384) -> (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧ -b^{64, 7}_0)
c  in CNF:
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_2
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_1
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_0
c  in DIMACS:
 17762  17763 -17764  384 -17765 0
 17762  17763 -17764  384 -17766 0
 17762  17763 -17764  384 -17767 0

c  0-1 --> -1
c    (-b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧ -p_384) -> ( b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0)
c  in CNF:
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨  b^{64, 7}_2
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_1
c     b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨  b^{64, 7}_0
c  in DIMACS:
 17762  17763  17764  384  17765 0
 17762  17763  17764  384 -17766 0
 17762  17763  17764  384  17767 0

c  -1-1 --> -2
c    ( b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧  b^{64, 6}_0 ∧ -p_384) -> ( b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0)
c  in CNF:
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨  b^{64, 7}_2
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨  b^{64, 7}_1
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨  p_384 ∨ -b^{64, 7}_0
c  in DIMACS:
-17762  17763 -17764  384  17765 0
-17762  17763 -17764  384  17766 0
-17762  17763 -17764  384 -17767 0

c  -2-1 --> break 
c    ( b^{64, 6}_2 ∧  b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨  b^{64, 6}_0 ∨  p_384 ∨ break
c  in DIMACS:
-17762 -17763  17764  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 6}_2 ∧ -b^{64, 6}_1 ∧ -b^{64, 6}_0 ∧ true) 
c  in CNF:
c    -b^{64, 6}_2 ∨  b^{64, 6}_1 ∨  b^{64, 6}_0 ∨ false 
c  in DIMACS:
-17762  17763  17764  0

c  3 does not represent an automaton state.
c    -(-b^{64, 6}_2 ∧  b^{64, 6}_1 ∧  b^{64, 6}_0 ∧ true) 
c  in CNF:
c     b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ false 
c  in DIMACS:
 17762 -17763 -17764  0
c  -3 does not represent an automaton state.
c    -( b^{64, 6}_2 ∧  b^{64, 6}_1 ∧  b^{64, 6}_0 ∧ true) 
c  in CNF:
c    -b^{64, 6}_2 ∨ -b^{64, 6}_1 ∨ -b^{64, 6}_0 ∨ false 
c  in DIMACS:
-17762 -17763 -17764  0

c i = 7
c  -2+1 --> -1
c    ( b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧  p_448) -> ( b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0)
c  in CNF:
c    -b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨  b^{64, 8}_2
c    -b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_1
c    -b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨  b^{64, 8}_0
c  in DIMACS:
-17765 -17766  17767 -448  17768 0
-17765 -17766  17767 -448 -17769 0
-17765 -17766  17767 -448  17770 0

c  -1+1 --> 0
c    ( b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0 ∧  p_448) -> (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧ -b^{64, 8}_0)
c  in CNF:
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_2
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_1
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_0
c  in DIMACS:
-17765  17766 -17767 -448 -17768 0
-17765  17766 -17767 -448 -17769 0
-17765  17766 -17767 -448 -17770 0

c  0+1 --> 1
c    (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧  p_448) -> (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0)
c  in CNF:
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_2
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_1
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨  b^{64, 8}_0
c  in DIMACS:
 17765  17766  17767 -448 -17768 0
 17765  17766  17767 -448 -17769 0
 17765  17766  17767 -448  17770 0

c  1+1 --> 2
c    (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0 ∧  p_448) -> (-b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0)
c  in CNF:
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_2
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨  b^{64, 8}_1
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ -p_448 ∨ -b^{64, 8}_0
c  in DIMACS:
 17765  17766 -17767 -448 -17768 0
 17765  17766 -17767 -448  17769 0
 17765  17766 -17767 -448 -17770 0

c  2+1 --> break 
c    (-b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧  p_448) -> break
c  in CNF:
c     b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 17765 -17766  17767 -448 1162 0


c  2-1 --> 1
c    (-b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧ -p_448) -> (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0)
c  in CNF:
c     b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_2
c     b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_1
c     b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨  b^{64, 8}_0
c  in DIMACS:
 17765 -17766  17767  448 -17768 0
 17765 -17766  17767  448 -17769 0
 17765 -17766  17767  448  17770 0

c  1-1 --> 0
c    (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0 ∧ -p_448) -> (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧ -b^{64, 8}_0)
c  in CNF:
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_2
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_1
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_0
c  in DIMACS:
 17765  17766 -17767  448 -17768 0
 17765  17766 -17767  448 -17769 0
 17765  17766 -17767  448 -17770 0

c  0-1 --> -1
c    (-b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧ -p_448) -> ( b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0)
c  in CNF:
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨  b^{64, 8}_2
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_1
c     b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨  b^{64, 8}_0
c  in DIMACS:
 17765  17766  17767  448  17768 0
 17765  17766  17767  448 -17769 0
 17765  17766  17767  448  17770 0

c  -1-1 --> -2
c    ( b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧  b^{64, 7}_0 ∧ -p_448) -> ( b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0)
c  in CNF:
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨  b^{64, 8}_2
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨  b^{64, 8}_1
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨  p_448 ∨ -b^{64, 8}_0
c  in DIMACS:
-17765  17766 -17767  448  17768 0
-17765  17766 -17767  448  17769 0
-17765  17766 -17767  448 -17770 0

c  -2-1 --> break 
c    ( b^{64, 7}_2 ∧  b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨  b^{64, 7}_0 ∨  p_448 ∨ break
c  in DIMACS:
-17765 -17766  17767  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 7}_2 ∧ -b^{64, 7}_1 ∧ -b^{64, 7}_0 ∧ true) 
c  in CNF:
c    -b^{64, 7}_2 ∨  b^{64, 7}_1 ∨  b^{64, 7}_0 ∨ false 
c  in DIMACS:
-17765  17766  17767  0

c  3 does not represent an automaton state.
c    -(-b^{64, 7}_2 ∧  b^{64, 7}_1 ∧  b^{64, 7}_0 ∧ true) 
c  in CNF:
c     b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ false 
c  in DIMACS:
 17765 -17766 -17767  0
c  -3 does not represent an automaton state.
c    -( b^{64, 7}_2 ∧  b^{64, 7}_1 ∧  b^{64, 7}_0 ∧ true) 
c  in CNF:
c    -b^{64, 7}_2 ∨ -b^{64, 7}_1 ∨ -b^{64, 7}_0 ∨ false 
c  in DIMACS:
-17765 -17766 -17767  0

c i = 8
c  -2+1 --> -1
c    ( b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧  p_512) -> ( b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0)
c  in CNF:
c    -b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨  b^{64, 9}_2
c    -b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_1
c    -b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨  b^{64, 9}_0
c  in DIMACS:
-17768 -17769  17770 -512  17771 0
-17768 -17769  17770 -512 -17772 0
-17768 -17769  17770 -512  17773 0

c  -1+1 --> 0
c    ( b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0 ∧  p_512) -> (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧ -b^{64, 9}_0)
c  in CNF:
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_2
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_1
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_0
c  in DIMACS:
-17768  17769 -17770 -512 -17771 0
-17768  17769 -17770 -512 -17772 0
-17768  17769 -17770 -512 -17773 0

c  0+1 --> 1
c    (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧  p_512) -> (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0)
c  in CNF:
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_2
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_1
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨  b^{64, 9}_0
c  in DIMACS:
 17768  17769  17770 -512 -17771 0
 17768  17769  17770 -512 -17772 0
 17768  17769  17770 -512  17773 0

c  1+1 --> 2
c    (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0 ∧  p_512) -> (-b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0)
c  in CNF:
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_2
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨  b^{64, 9}_1
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ -p_512 ∨ -b^{64, 9}_0
c  in DIMACS:
 17768  17769 -17770 -512 -17771 0
 17768  17769 -17770 -512  17772 0
 17768  17769 -17770 -512 -17773 0

c  2+1 --> break 
c    (-b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧  p_512) -> break
c  in CNF:
c     b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 17768 -17769  17770 -512 1162 0


c  2-1 --> 1
c    (-b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧ -p_512) -> (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0)
c  in CNF:
c     b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_2
c     b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_1
c     b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨  b^{64, 9}_0
c  in DIMACS:
 17768 -17769  17770  512 -17771 0
 17768 -17769  17770  512 -17772 0
 17768 -17769  17770  512  17773 0

c  1-1 --> 0
c    (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0 ∧ -p_512) -> (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧ -b^{64, 9}_0)
c  in CNF:
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_2
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_1
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_0
c  in DIMACS:
 17768  17769 -17770  512 -17771 0
 17768  17769 -17770  512 -17772 0
 17768  17769 -17770  512 -17773 0

c  0-1 --> -1
c    (-b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧ -p_512) -> ( b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0)
c  in CNF:
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨  b^{64, 9}_2
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_1
c     b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨  b^{64, 9}_0
c  in DIMACS:
 17768  17769  17770  512  17771 0
 17768  17769  17770  512 -17772 0
 17768  17769  17770  512  17773 0

c  -1-1 --> -2
c    ( b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧  b^{64, 8}_0 ∧ -p_512) -> ( b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0)
c  in CNF:
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨  b^{64, 9}_2
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨  b^{64, 9}_1
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨  p_512 ∨ -b^{64, 9}_0
c  in DIMACS:
-17768  17769 -17770  512  17771 0
-17768  17769 -17770  512  17772 0
-17768  17769 -17770  512 -17773 0

c  -2-1 --> break 
c    ( b^{64, 8}_2 ∧  b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨  b^{64, 8}_0 ∨  p_512 ∨ break
c  in DIMACS:
-17768 -17769  17770  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 8}_2 ∧ -b^{64, 8}_1 ∧ -b^{64, 8}_0 ∧ true) 
c  in CNF:
c    -b^{64, 8}_2 ∨  b^{64, 8}_1 ∨  b^{64, 8}_0 ∨ false 
c  in DIMACS:
-17768  17769  17770  0

c  3 does not represent an automaton state.
c    -(-b^{64, 8}_2 ∧  b^{64, 8}_1 ∧  b^{64, 8}_0 ∧ true) 
c  in CNF:
c     b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ false 
c  in DIMACS:
 17768 -17769 -17770  0
c  -3 does not represent an automaton state.
c    -( b^{64, 8}_2 ∧  b^{64, 8}_1 ∧  b^{64, 8}_0 ∧ true) 
c  in CNF:
c    -b^{64, 8}_2 ∨ -b^{64, 8}_1 ∨ -b^{64, 8}_0 ∨ false 
c  in DIMACS:
-17768 -17769 -17770  0

c i = 9
c  -2+1 --> -1
c    ( b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧  p_576) -> ( b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0)
c  in CNF:
c    -b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨  b^{64, 10}_2
c    -b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_1
c    -b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨  b^{64, 10}_0
c  in DIMACS:
-17771 -17772  17773 -576  17774 0
-17771 -17772  17773 -576 -17775 0
-17771 -17772  17773 -576  17776 0

c  -1+1 --> 0
c    ( b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0 ∧  p_576) -> (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧ -b^{64, 10}_0)
c  in CNF:
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_2
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_1
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_0
c  in DIMACS:
-17771  17772 -17773 -576 -17774 0
-17771  17772 -17773 -576 -17775 0
-17771  17772 -17773 -576 -17776 0

c  0+1 --> 1
c    (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧  p_576) -> (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0)
c  in CNF:
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_2
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_1
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨  b^{64, 10}_0
c  in DIMACS:
 17771  17772  17773 -576 -17774 0
 17771  17772  17773 -576 -17775 0
 17771  17772  17773 -576  17776 0

c  1+1 --> 2
c    (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0 ∧  p_576) -> (-b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0)
c  in CNF:
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_2
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨  b^{64, 10}_1
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ -p_576 ∨ -b^{64, 10}_0
c  in DIMACS:
 17771  17772 -17773 -576 -17774 0
 17771  17772 -17773 -576  17775 0
 17771  17772 -17773 -576 -17776 0

c  2+1 --> break 
c    (-b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧  p_576) -> break
c  in CNF:
c     b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 17771 -17772  17773 -576 1162 0


c  2-1 --> 1
c    (-b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧ -p_576) -> (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0)
c  in CNF:
c     b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_2
c     b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_1
c     b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨  b^{64, 10}_0
c  in DIMACS:
 17771 -17772  17773  576 -17774 0
 17771 -17772  17773  576 -17775 0
 17771 -17772  17773  576  17776 0

c  1-1 --> 0
c    (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0 ∧ -p_576) -> (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧ -b^{64, 10}_0)
c  in CNF:
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_2
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_1
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_0
c  in DIMACS:
 17771  17772 -17773  576 -17774 0
 17771  17772 -17773  576 -17775 0
 17771  17772 -17773  576 -17776 0

c  0-1 --> -1
c    (-b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧ -p_576) -> ( b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0)
c  in CNF:
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨  b^{64, 10}_2
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_1
c     b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨  b^{64, 10}_0
c  in DIMACS:
 17771  17772  17773  576  17774 0
 17771  17772  17773  576 -17775 0
 17771  17772  17773  576  17776 0

c  -1-1 --> -2
c    ( b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧  b^{64, 9}_0 ∧ -p_576) -> ( b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0)
c  in CNF:
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨  b^{64, 10}_2
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨  b^{64, 10}_1
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨  p_576 ∨ -b^{64, 10}_0
c  in DIMACS:
-17771  17772 -17773  576  17774 0
-17771  17772 -17773  576  17775 0
-17771  17772 -17773  576 -17776 0

c  -2-1 --> break 
c    ( b^{64, 9}_2 ∧  b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨  b^{64, 9}_0 ∨  p_576 ∨ break
c  in DIMACS:
-17771 -17772  17773  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 9}_2 ∧ -b^{64, 9}_1 ∧ -b^{64, 9}_0 ∧ true) 
c  in CNF:
c    -b^{64, 9}_2 ∨  b^{64, 9}_1 ∨  b^{64, 9}_0 ∨ false 
c  in DIMACS:
-17771  17772  17773  0

c  3 does not represent an automaton state.
c    -(-b^{64, 9}_2 ∧  b^{64, 9}_1 ∧  b^{64, 9}_0 ∧ true) 
c  in CNF:
c     b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ false 
c  in DIMACS:
 17771 -17772 -17773  0
c  -3 does not represent an automaton state.
c    -( b^{64, 9}_2 ∧  b^{64, 9}_1 ∧  b^{64, 9}_0 ∧ true) 
c  in CNF:
c    -b^{64, 9}_2 ∨ -b^{64, 9}_1 ∨ -b^{64, 9}_0 ∨ false 
c  in DIMACS:
-17771 -17772 -17773  0

c i = 10
c  -2+1 --> -1
c    ( b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧  p_640) -> ( b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0)
c  in CNF:
c    -b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨  b^{64, 11}_2
c    -b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_1
c    -b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨  b^{64, 11}_0
c  in DIMACS:
-17774 -17775  17776 -640  17777 0
-17774 -17775  17776 -640 -17778 0
-17774 -17775  17776 -640  17779 0

c  -1+1 --> 0
c    ( b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0 ∧  p_640) -> (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧ -b^{64, 11}_0)
c  in CNF:
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_2
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_1
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_0
c  in DIMACS:
-17774  17775 -17776 -640 -17777 0
-17774  17775 -17776 -640 -17778 0
-17774  17775 -17776 -640 -17779 0

c  0+1 --> 1
c    (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧  p_640) -> (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0)
c  in CNF:
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_2
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_1
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨  b^{64, 11}_0
c  in DIMACS:
 17774  17775  17776 -640 -17777 0
 17774  17775  17776 -640 -17778 0
 17774  17775  17776 -640  17779 0

c  1+1 --> 2
c    (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0 ∧  p_640) -> (-b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0)
c  in CNF:
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_2
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨  b^{64, 11}_1
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ -p_640 ∨ -b^{64, 11}_0
c  in DIMACS:
 17774  17775 -17776 -640 -17777 0
 17774  17775 -17776 -640  17778 0
 17774  17775 -17776 -640 -17779 0

c  2+1 --> break 
c    (-b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧  p_640) -> break
c  in CNF:
c     b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 17774 -17775  17776 -640 1162 0


c  2-1 --> 1
c    (-b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧ -p_640) -> (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0)
c  in CNF:
c     b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_2
c     b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_1
c     b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨  b^{64, 11}_0
c  in DIMACS:
 17774 -17775  17776  640 -17777 0
 17774 -17775  17776  640 -17778 0
 17774 -17775  17776  640  17779 0

c  1-1 --> 0
c    (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0 ∧ -p_640) -> (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧ -b^{64, 11}_0)
c  in CNF:
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_2
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_1
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_0
c  in DIMACS:
 17774  17775 -17776  640 -17777 0
 17774  17775 -17776  640 -17778 0
 17774  17775 -17776  640 -17779 0

c  0-1 --> -1
c    (-b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧ -p_640) -> ( b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0)
c  in CNF:
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨  b^{64, 11}_2
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_1
c     b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨  b^{64, 11}_0
c  in DIMACS:
 17774  17775  17776  640  17777 0
 17774  17775  17776  640 -17778 0
 17774  17775  17776  640  17779 0

c  -1-1 --> -2
c    ( b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧  b^{64, 10}_0 ∧ -p_640) -> ( b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0)
c  in CNF:
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨  b^{64, 11}_2
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨  b^{64, 11}_1
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨  p_640 ∨ -b^{64, 11}_0
c  in DIMACS:
-17774  17775 -17776  640  17777 0
-17774  17775 -17776  640  17778 0
-17774  17775 -17776  640 -17779 0

c  -2-1 --> break 
c    ( b^{64, 10}_2 ∧  b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨  b^{64, 10}_0 ∨  p_640 ∨ break
c  in DIMACS:
-17774 -17775  17776  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 10}_2 ∧ -b^{64, 10}_1 ∧ -b^{64, 10}_0 ∧ true) 
c  in CNF:
c    -b^{64, 10}_2 ∨  b^{64, 10}_1 ∨  b^{64, 10}_0 ∨ false 
c  in DIMACS:
-17774  17775  17776  0

c  3 does not represent an automaton state.
c    -(-b^{64, 10}_2 ∧  b^{64, 10}_1 ∧  b^{64, 10}_0 ∧ true) 
c  in CNF:
c     b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ false 
c  in DIMACS:
 17774 -17775 -17776  0
c  -3 does not represent an automaton state.
c    -( b^{64, 10}_2 ∧  b^{64, 10}_1 ∧  b^{64, 10}_0 ∧ true) 
c  in CNF:
c    -b^{64, 10}_2 ∨ -b^{64, 10}_1 ∨ -b^{64, 10}_0 ∨ false 
c  in DIMACS:
-17774 -17775 -17776  0

c i = 11
c  -2+1 --> -1
c    ( b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧  p_704) -> ( b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0)
c  in CNF:
c    -b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨  b^{64, 12}_2
c    -b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_1
c    -b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨  b^{64, 12}_0
c  in DIMACS:
-17777 -17778  17779 -704  17780 0
-17777 -17778  17779 -704 -17781 0
-17777 -17778  17779 -704  17782 0

c  -1+1 --> 0
c    ( b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0 ∧  p_704) -> (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧ -b^{64, 12}_0)
c  in CNF:
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_2
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_1
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_0
c  in DIMACS:
-17777  17778 -17779 -704 -17780 0
-17777  17778 -17779 -704 -17781 0
-17777  17778 -17779 -704 -17782 0

c  0+1 --> 1
c    (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧  p_704) -> (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0)
c  in CNF:
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_2
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_1
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨  b^{64, 12}_0
c  in DIMACS:
 17777  17778  17779 -704 -17780 0
 17777  17778  17779 -704 -17781 0
 17777  17778  17779 -704  17782 0

c  1+1 --> 2
c    (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0 ∧  p_704) -> (-b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0)
c  in CNF:
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_2
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨  b^{64, 12}_1
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ -p_704 ∨ -b^{64, 12}_0
c  in DIMACS:
 17777  17778 -17779 -704 -17780 0
 17777  17778 -17779 -704  17781 0
 17777  17778 -17779 -704 -17782 0

c  2+1 --> break 
c    (-b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧  p_704) -> break
c  in CNF:
c     b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 17777 -17778  17779 -704 1162 0


c  2-1 --> 1
c    (-b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧ -p_704) -> (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0)
c  in CNF:
c     b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_2
c     b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_1
c     b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨  b^{64, 12}_0
c  in DIMACS:
 17777 -17778  17779  704 -17780 0
 17777 -17778  17779  704 -17781 0
 17777 -17778  17779  704  17782 0

c  1-1 --> 0
c    (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0 ∧ -p_704) -> (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧ -b^{64, 12}_0)
c  in CNF:
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_2
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_1
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_0
c  in DIMACS:
 17777  17778 -17779  704 -17780 0
 17777  17778 -17779  704 -17781 0
 17777  17778 -17779  704 -17782 0

c  0-1 --> -1
c    (-b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧ -p_704) -> ( b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0)
c  in CNF:
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨  b^{64, 12}_2
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_1
c     b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨  b^{64, 12}_0
c  in DIMACS:
 17777  17778  17779  704  17780 0
 17777  17778  17779  704 -17781 0
 17777  17778  17779  704  17782 0

c  -1-1 --> -2
c    ( b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧  b^{64, 11}_0 ∧ -p_704) -> ( b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0)
c  in CNF:
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨  b^{64, 12}_2
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨  b^{64, 12}_1
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨  p_704 ∨ -b^{64, 12}_0
c  in DIMACS:
-17777  17778 -17779  704  17780 0
-17777  17778 -17779  704  17781 0
-17777  17778 -17779  704 -17782 0

c  -2-1 --> break 
c    ( b^{64, 11}_2 ∧  b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨  b^{64, 11}_0 ∨  p_704 ∨ break
c  in DIMACS:
-17777 -17778  17779  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 11}_2 ∧ -b^{64, 11}_1 ∧ -b^{64, 11}_0 ∧ true) 
c  in CNF:
c    -b^{64, 11}_2 ∨  b^{64, 11}_1 ∨  b^{64, 11}_0 ∨ false 
c  in DIMACS:
-17777  17778  17779  0

c  3 does not represent an automaton state.
c    -(-b^{64, 11}_2 ∧  b^{64, 11}_1 ∧  b^{64, 11}_0 ∧ true) 
c  in CNF:
c     b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ false 
c  in DIMACS:
 17777 -17778 -17779  0
c  -3 does not represent an automaton state.
c    -( b^{64, 11}_2 ∧  b^{64, 11}_1 ∧  b^{64, 11}_0 ∧ true) 
c  in CNF:
c    -b^{64, 11}_2 ∨ -b^{64, 11}_1 ∨ -b^{64, 11}_0 ∨ false 
c  in DIMACS:
-17777 -17778 -17779  0

c i = 12
c  -2+1 --> -1
c    ( b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧  p_768) -> ( b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0)
c  in CNF:
c    -b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨  b^{64, 13}_2
c    -b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_1
c    -b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨  b^{64, 13}_0
c  in DIMACS:
-17780 -17781  17782 -768  17783 0
-17780 -17781  17782 -768 -17784 0
-17780 -17781  17782 -768  17785 0

c  -1+1 --> 0
c    ( b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0 ∧  p_768) -> (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧ -b^{64, 13}_0)
c  in CNF:
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_2
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_1
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_0
c  in DIMACS:
-17780  17781 -17782 -768 -17783 0
-17780  17781 -17782 -768 -17784 0
-17780  17781 -17782 -768 -17785 0

c  0+1 --> 1
c    (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧  p_768) -> (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0)
c  in CNF:
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_2
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_1
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨  b^{64, 13}_0
c  in DIMACS:
 17780  17781  17782 -768 -17783 0
 17780  17781  17782 -768 -17784 0
 17780  17781  17782 -768  17785 0

c  1+1 --> 2
c    (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0 ∧  p_768) -> (-b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0)
c  in CNF:
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_2
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨  b^{64, 13}_1
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ -p_768 ∨ -b^{64, 13}_0
c  in DIMACS:
 17780  17781 -17782 -768 -17783 0
 17780  17781 -17782 -768  17784 0
 17780  17781 -17782 -768 -17785 0

c  2+1 --> break 
c    (-b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧  p_768) -> break
c  in CNF:
c     b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 17780 -17781  17782 -768 1162 0


c  2-1 --> 1
c    (-b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧ -p_768) -> (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0)
c  in CNF:
c     b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_2
c     b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_1
c     b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨  b^{64, 13}_0
c  in DIMACS:
 17780 -17781  17782  768 -17783 0
 17780 -17781  17782  768 -17784 0
 17780 -17781  17782  768  17785 0

c  1-1 --> 0
c    (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0 ∧ -p_768) -> (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧ -b^{64, 13}_0)
c  in CNF:
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_2
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_1
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_0
c  in DIMACS:
 17780  17781 -17782  768 -17783 0
 17780  17781 -17782  768 -17784 0
 17780  17781 -17782  768 -17785 0

c  0-1 --> -1
c    (-b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧ -p_768) -> ( b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0)
c  in CNF:
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨  b^{64, 13}_2
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_1
c     b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨  b^{64, 13}_0
c  in DIMACS:
 17780  17781  17782  768  17783 0
 17780  17781  17782  768 -17784 0
 17780  17781  17782  768  17785 0

c  -1-1 --> -2
c    ( b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧  b^{64, 12}_0 ∧ -p_768) -> ( b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0)
c  in CNF:
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨  b^{64, 13}_2
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨  b^{64, 13}_1
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨  p_768 ∨ -b^{64, 13}_0
c  in DIMACS:
-17780  17781 -17782  768  17783 0
-17780  17781 -17782  768  17784 0
-17780  17781 -17782  768 -17785 0

c  -2-1 --> break 
c    ( b^{64, 12}_2 ∧  b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨  b^{64, 12}_0 ∨  p_768 ∨ break
c  in DIMACS:
-17780 -17781  17782  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 12}_2 ∧ -b^{64, 12}_1 ∧ -b^{64, 12}_0 ∧ true) 
c  in CNF:
c    -b^{64, 12}_2 ∨  b^{64, 12}_1 ∨  b^{64, 12}_0 ∨ false 
c  in DIMACS:
-17780  17781  17782  0

c  3 does not represent an automaton state.
c    -(-b^{64, 12}_2 ∧  b^{64, 12}_1 ∧  b^{64, 12}_0 ∧ true) 
c  in CNF:
c     b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ false 
c  in DIMACS:
 17780 -17781 -17782  0
c  -3 does not represent an automaton state.
c    -( b^{64, 12}_2 ∧  b^{64, 12}_1 ∧  b^{64, 12}_0 ∧ true) 
c  in CNF:
c    -b^{64, 12}_2 ∨ -b^{64, 12}_1 ∨ -b^{64, 12}_0 ∨ false 
c  in DIMACS:
-17780 -17781 -17782  0

c i = 13
c  -2+1 --> -1
c    ( b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧  p_832) -> ( b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0)
c  in CNF:
c    -b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨  b^{64, 14}_2
c    -b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_1
c    -b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨  b^{64, 14}_0
c  in DIMACS:
-17783 -17784  17785 -832  17786 0
-17783 -17784  17785 -832 -17787 0
-17783 -17784  17785 -832  17788 0

c  -1+1 --> 0
c    ( b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0 ∧  p_832) -> (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧ -b^{64, 14}_0)
c  in CNF:
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_2
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_1
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_0
c  in DIMACS:
-17783  17784 -17785 -832 -17786 0
-17783  17784 -17785 -832 -17787 0
-17783  17784 -17785 -832 -17788 0

c  0+1 --> 1
c    (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧  p_832) -> (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0)
c  in CNF:
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_2
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_1
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨  b^{64, 14}_0
c  in DIMACS:
 17783  17784  17785 -832 -17786 0
 17783  17784  17785 -832 -17787 0
 17783  17784  17785 -832  17788 0

c  1+1 --> 2
c    (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0 ∧  p_832) -> (-b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0)
c  in CNF:
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_2
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨  b^{64, 14}_1
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ -p_832 ∨ -b^{64, 14}_0
c  in DIMACS:
 17783  17784 -17785 -832 -17786 0
 17783  17784 -17785 -832  17787 0
 17783  17784 -17785 -832 -17788 0

c  2+1 --> break 
c    (-b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧  p_832) -> break
c  in CNF:
c     b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 17783 -17784  17785 -832 1162 0


c  2-1 --> 1
c    (-b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧ -p_832) -> (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0)
c  in CNF:
c     b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_2
c     b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_1
c     b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨  b^{64, 14}_0
c  in DIMACS:
 17783 -17784  17785  832 -17786 0
 17783 -17784  17785  832 -17787 0
 17783 -17784  17785  832  17788 0

c  1-1 --> 0
c    (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0 ∧ -p_832) -> (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧ -b^{64, 14}_0)
c  in CNF:
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_2
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_1
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_0
c  in DIMACS:
 17783  17784 -17785  832 -17786 0
 17783  17784 -17785  832 -17787 0
 17783  17784 -17785  832 -17788 0

c  0-1 --> -1
c    (-b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧ -p_832) -> ( b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0)
c  in CNF:
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨  b^{64, 14}_2
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_1
c     b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨  b^{64, 14}_0
c  in DIMACS:
 17783  17784  17785  832  17786 0
 17783  17784  17785  832 -17787 0
 17783  17784  17785  832  17788 0

c  -1-1 --> -2
c    ( b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧  b^{64, 13}_0 ∧ -p_832) -> ( b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0)
c  in CNF:
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨  b^{64, 14}_2
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨  b^{64, 14}_1
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨  p_832 ∨ -b^{64, 14}_0
c  in DIMACS:
-17783  17784 -17785  832  17786 0
-17783  17784 -17785  832  17787 0
-17783  17784 -17785  832 -17788 0

c  -2-1 --> break 
c    ( b^{64, 13}_2 ∧  b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨  b^{64, 13}_0 ∨  p_832 ∨ break
c  in DIMACS:
-17783 -17784  17785  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 13}_2 ∧ -b^{64, 13}_1 ∧ -b^{64, 13}_0 ∧ true) 
c  in CNF:
c    -b^{64, 13}_2 ∨  b^{64, 13}_1 ∨  b^{64, 13}_0 ∨ false 
c  in DIMACS:
-17783  17784  17785  0

c  3 does not represent an automaton state.
c    -(-b^{64, 13}_2 ∧  b^{64, 13}_1 ∧  b^{64, 13}_0 ∧ true) 
c  in CNF:
c     b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ false 
c  in DIMACS:
 17783 -17784 -17785  0
c  -3 does not represent an automaton state.
c    -( b^{64, 13}_2 ∧  b^{64, 13}_1 ∧  b^{64, 13}_0 ∧ true) 
c  in CNF:
c    -b^{64, 13}_2 ∨ -b^{64, 13}_1 ∨ -b^{64, 13}_0 ∨ false 
c  in DIMACS:
-17783 -17784 -17785  0

c i = 14
c  -2+1 --> -1
c    ( b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧  p_896) -> ( b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0)
c  in CNF:
c    -b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨  b^{64, 15}_2
c    -b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_1
c    -b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨  b^{64, 15}_0
c  in DIMACS:
-17786 -17787  17788 -896  17789 0
-17786 -17787  17788 -896 -17790 0
-17786 -17787  17788 -896  17791 0

c  -1+1 --> 0
c    ( b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0 ∧  p_896) -> (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧ -b^{64, 15}_0)
c  in CNF:
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_2
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_1
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_0
c  in DIMACS:
-17786  17787 -17788 -896 -17789 0
-17786  17787 -17788 -896 -17790 0
-17786  17787 -17788 -896 -17791 0

c  0+1 --> 1
c    (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧  p_896) -> (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0)
c  in CNF:
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_2
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_1
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨  b^{64, 15}_0
c  in DIMACS:
 17786  17787  17788 -896 -17789 0
 17786  17787  17788 -896 -17790 0
 17786  17787  17788 -896  17791 0

c  1+1 --> 2
c    (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0 ∧  p_896) -> (-b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0)
c  in CNF:
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_2
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨  b^{64, 15}_1
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ -p_896 ∨ -b^{64, 15}_0
c  in DIMACS:
 17786  17787 -17788 -896 -17789 0
 17786  17787 -17788 -896  17790 0
 17786  17787 -17788 -896 -17791 0

c  2+1 --> break 
c    (-b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧  p_896) -> break
c  in CNF:
c     b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 17786 -17787  17788 -896 1162 0


c  2-1 --> 1
c    (-b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧ -p_896) -> (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0)
c  in CNF:
c     b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_2
c     b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_1
c     b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨  b^{64, 15}_0
c  in DIMACS:
 17786 -17787  17788  896 -17789 0
 17786 -17787  17788  896 -17790 0
 17786 -17787  17788  896  17791 0

c  1-1 --> 0
c    (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0 ∧ -p_896) -> (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧ -b^{64, 15}_0)
c  in CNF:
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_2
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_1
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_0
c  in DIMACS:
 17786  17787 -17788  896 -17789 0
 17786  17787 -17788  896 -17790 0
 17786  17787 -17788  896 -17791 0

c  0-1 --> -1
c    (-b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧ -p_896) -> ( b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0)
c  in CNF:
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨  b^{64, 15}_2
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_1
c     b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨  b^{64, 15}_0
c  in DIMACS:
 17786  17787  17788  896  17789 0
 17786  17787  17788  896 -17790 0
 17786  17787  17788  896  17791 0

c  -1-1 --> -2
c    ( b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧  b^{64, 14}_0 ∧ -p_896) -> ( b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0)
c  in CNF:
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨  b^{64, 15}_2
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨  b^{64, 15}_1
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨  p_896 ∨ -b^{64, 15}_0
c  in DIMACS:
-17786  17787 -17788  896  17789 0
-17786  17787 -17788  896  17790 0
-17786  17787 -17788  896 -17791 0

c  -2-1 --> break 
c    ( b^{64, 14}_2 ∧  b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨  b^{64, 14}_0 ∨  p_896 ∨ break
c  in DIMACS:
-17786 -17787  17788  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 14}_2 ∧ -b^{64, 14}_1 ∧ -b^{64, 14}_0 ∧ true) 
c  in CNF:
c    -b^{64, 14}_2 ∨  b^{64, 14}_1 ∨  b^{64, 14}_0 ∨ false 
c  in DIMACS:
-17786  17787  17788  0

c  3 does not represent an automaton state.
c    -(-b^{64, 14}_2 ∧  b^{64, 14}_1 ∧  b^{64, 14}_0 ∧ true) 
c  in CNF:
c     b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ false 
c  in DIMACS:
 17786 -17787 -17788  0
c  -3 does not represent an automaton state.
c    -( b^{64, 14}_2 ∧  b^{64, 14}_1 ∧  b^{64, 14}_0 ∧ true) 
c  in CNF:
c    -b^{64, 14}_2 ∨ -b^{64, 14}_1 ∨ -b^{64, 14}_0 ∨ false 
c  in DIMACS:
-17786 -17787 -17788  0

c i = 15
c  -2+1 --> -1
c    ( b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧  p_960) -> ( b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0)
c  in CNF:
c    -b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨  b^{64, 16}_2
c    -b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_1
c    -b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨  b^{64, 16}_0
c  in DIMACS:
-17789 -17790  17791 -960  17792 0
-17789 -17790  17791 -960 -17793 0
-17789 -17790  17791 -960  17794 0

c  -1+1 --> 0
c    ( b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0 ∧  p_960) -> (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧ -b^{64, 16}_0)
c  in CNF:
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_2
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_1
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_0
c  in DIMACS:
-17789  17790 -17791 -960 -17792 0
-17789  17790 -17791 -960 -17793 0
-17789  17790 -17791 -960 -17794 0

c  0+1 --> 1
c    (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧  p_960) -> (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0)
c  in CNF:
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_2
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_1
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨  b^{64, 16}_0
c  in DIMACS:
 17789  17790  17791 -960 -17792 0
 17789  17790  17791 -960 -17793 0
 17789  17790  17791 -960  17794 0

c  1+1 --> 2
c    (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0 ∧  p_960) -> (-b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0)
c  in CNF:
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_2
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨  b^{64, 16}_1
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ -p_960 ∨ -b^{64, 16}_0
c  in DIMACS:
 17789  17790 -17791 -960 -17792 0
 17789  17790 -17791 -960  17793 0
 17789  17790 -17791 -960 -17794 0

c  2+1 --> break 
c    (-b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧  p_960) -> break
c  in CNF:
c     b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 17789 -17790  17791 -960 1162 0


c  2-1 --> 1
c    (-b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧ -p_960) -> (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0)
c  in CNF:
c     b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_2
c     b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_1
c     b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨  b^{64, 16}_0
c  in DIMACS:
 17789 -17790  17791  960 -17792 0
 17789 -17790  17791  960 -17793 0
 17789 -17790  17791  960  17794 0

c  1-1 --> 0
c    (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0 ∧ -p_960) -> (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧ -b^{64, 16}_0)
c  in CNF:
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_2
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_1
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_0
c  in DIMACS:
 17789  17790 -17791  960 -17792 0
 17789  17790 -17791  960 -17793 0
 17789  17790 -17791  960 -17794 0

c  0-1 --> -1
c    (-b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧ -p_960) -> ( b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0)
c  in CNF:
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨  b^{64, 16}_2
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_1
c     b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨  b^{64, 16}_0
c  in DIMACS:
 17789  17790  17791  960  17792 0
 17789  17790  17791  960 -17793 0
 17789  17790  17791  960  17794 0

c  -1-1 --> -2
c    ( b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧  b^{64, 15}_0 ∧ -p_960) -> ( b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0)
c  in CNF:
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨  b^{64, 16}_2
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨  b^{64, 16}_1
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨  p_960 ∨ -b^{64, 16}_0
c  in DIMACS:
-17789  17790 -17791  960  17792 0
-17789  17790 -17791  960  17793 0
-17789  17790 -17791  960 -17794 0

c  -2-1 --> break 
c    ( b^{64, 15}_2 ∧  b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨  b^{64, 15}_0 ∨  p_960 ∨ break
c  in DIMACS:
-17789 -17790  17791  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 15}_2 ∧ -b^{64, 15}_1 ∧ -b^{64, 15}_0 ∧ true) 
c  in CNF:
c    -b^{64, 15}_2 ∨  b^{64, 15}_1 ∨  b^{64, 15}_0 ∨ false 
c  in DIMACS:
-17789  17790  17791  0

c  3 does not represent an automaton state.
c    -(-b^{64, 15}_2 ∧  b^{64, 15}_1 ∧  b^{64, 15}_0 ∧ true) 
c  in CNF:
c     b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ false 
c  in DIMACS:
 17789 -17790 -17791  0
c  -3 does not represent an automaton state.
c    -( b^{64, 15}_2 ∧  b^{64, 15}_1 ∧  b^{64, 15}_0 ∧ true) 
c  in CNF:
c    -b^{64, 15}_2 ∨ -b^{64, 15}_1 ∨ -b^{64, 15}_0 ∨ false 
c  in DIMACS:
-17789 -17790 -17791  0

c i = 16
c  -2+1 --> -1
c    ( b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧  p_1024) -> ( b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0)
c  in CNF:
c    -b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨  b^{64, 17}_2
c    -b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_1
c    -b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨  b^{64, 17}_0
c  in DIMACS:
-17792 -17793  17794 -1024  17795 0
-17792 -17793  17794 -1024 -17796 0
-17792 -17793  17794 -1024  17797 0

c  -1+1 --> 0
c    ( b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0 ∧  p_1024) -> (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧ -b^{64, 17}_0)
c  in CNF:
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_2
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_1
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_0
c  in DIMACS:
-17792  17793 -17794 -1024 -17795 0
-17792  17793 -17794 -1024 -17796 0
-17792  17793 -17794 -1024 -17797 0

c  0+1 --> 1
c    (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧  p_1024) -> (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0)
c  in CNF:
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_2
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_1
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨  b^{64, 17}_0
c  in DIMACS:
 17792  17793  17794 -1024 -17795 0
 17792  17793  17794 -1024 -17796 0
 17792  17793  17794 -1024  17797 0

c  1+1 --> 2
c    (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0 ∧  p_1024) -> (-b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0)
c  in CNF:
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_2
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨  b^{64, 17}_1
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ -p_1024 ∨ -b^{64, 17}_0
c  in DIMACS:
 17792  17793 -17794 -1024 -17795 0
 17792  17793 -17794 -1024  17796 0
 17792  17793 -17794 -1024 -17797 0

c  2+1 --> break 
c    (-b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 17792 -17793  17794 -1024 1162 0


c  2-1 --> 1
c    (-b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧ -p_1024) -> (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0)
c  in CNF:
c     b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_2
c     b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_1
c     b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨  b^{64, 17}_0
c  in DIMACS:
 17792 -17793  17794  1024 -17795 0
 17792 -17793  17794  1024 -17796 0
 17792 -17793  17794  1024  17797 0

c  1-1 --> 0
c    (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0 ∧ -p_1024) -> (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧ -b^{64, 17}_0)
c  in CNF:
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_2
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_1
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_0
c  in DIMACS:
 17792  17793 -17794  1024 -17795 0
 17792  17793 -17794  1024 -17796 0
 17792  17793 -17794  1024 -17797 0

c  0-1 --> -1
c    (-b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧ -p_1024) -> ( b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0)
c  in CNF:
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨  b^{64, 17}_2
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_1
c     b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨  b^{64, 17}_0
c  in DIMACS:
 17792  17793  17794  1024  17795 0
 17792  17793  17794  1024 -17796 0
 17792  17793  17794  1024  17797 0

c  -1-1 --> -2
c    ( b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧  b^{64, 16}_0 ∧ -p_1024) -> ( b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0)
c  in CNF:
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨  b^{64, 17}_2
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨  b^{64, 17}_1
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨  p_1024 ∨ -b^{64, 17}_0
c  in DIMACS:
-17792  17793 -17794  1024  17795 0
-17792  17793 -17794  1024  17796 0
-17792  17793 -17794  1024 -17797 0

c  -2-1 --> break 
c    ( b^{64, 16}_2 ∧  b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨  b^{64, 16}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-17792 -17793  17794  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 16}_2 ∧ -b^{64, 16}_1 ∧ -b^{64, 16}_0 ∧ true) 
c  in CNF:
c    -b^{64, 16}_2 ∨  b^{64, 16}_1 ∨  b^{64, 16}_0 ∨ false 
c  in DIMACS:
-17792  17793  17794  0

c  3 does not represent an automaton state.
c    -(-b^{64, 16}_2 ∧  b^{64, 16}_1 ∧  b^{64, 16}_0 ∧ true) 
c  in CNF:
c     b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ false 
c  in DIMACS:
 17792 -17793 -17794  0
c  -3 does not represent an automaton state.
c    -( b^{64, 16}_2 ∧  b^{64, 16}_1 ∧  b^{64, 16}_0 ∧ true) 
c  in CNF:
c    -b^{64, 16}_2 ∨ -b^{64, 16}_1 ∨ -b^{64, 16}_0 ∨ false 
c  in DIMACS:
-17792 -17793 -17794  0

c i = 17
c  -2+1 --> -1
c    ( b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧  p_1088) -> ( b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0)
c  in CNF:
c    -b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨  b^{64, 18}_2
c    -b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_1
c    -b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨  b^{64, 18}_0
c  in DIMACS:
-17795 -17796  17797 -1088  17798 0
-17795 -17796  17797 -1088 -17799 0
-17795 -17796  17797 -1088  17800 0

c  -1+1 --> 0
c    ( b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0 ∧  p_1088) -> (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧ -b^{64, 18}_0)
c  in CNF:
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_2
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_1
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_0
c  in DIMACS:
-17795  17796 -17797 -1088 -17798 0
-17795  17796 -17797 -1088 -17799 0
-17795  17796 -17797 -1088 -17800 0

c  0+1 --> 1
c    (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧  p_1088) -> (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0)
c  in CNF:
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_2
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_1
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨  b^{64, 18}_0
c  in DIMACS:
 17795  17796  17797 -1088 -17798 0
 17795  17796  17797 -1088 -17799 0
 17795  17796  17797 -1088  17800 0

c  1+1 --> 2
c    (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0 ∧  p_1088) -> (-b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0)
c  in CNF:
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_2
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨  b^{64, 18}_1
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ -p_1088 ∨ -b^{64, 18}_0
c  in DIMACS:
 17795  17796 -17797 -1088 -17798 0
 17795  17796 -17797 -1088  17799 0
 17795  17796 -17797 -1088 -17800 0

c  2+1 --> break 
c    (-b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 17795 -17796  17797 -1088 1162 0


c  2-1 --> 1
c    (-b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧ -p_1088) -> (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0)
c  in CNF:
c     b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_2
c     b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_1
c     b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨  b^{64, 18}_0
c  in DIMACS:
 17795 -17796  17797  1088 -17798 0
 17795 -17796  17797  1088 -17799 0
 17795 -17796  17797  1088  17800 0

c  1-1 --> 0
c    (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0 ∧ -p_1088) -> (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧ -b^{64, 18}_0)
c  in CNF:
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_2
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_1
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_0
c  in DIMACS:
 17795  17796 -17797  1088 -17798 0
 17795  17796 -17797  1088 -17799 0
 17795  17796 -17797  1088 -17800 0

c  0-1 --> -1
c    (-b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧ -p_1088) -> ( b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0)
c  in CNF:
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨  b^{64, 18}_2
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_1
c     b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨  b^{64, 18}_0
c  in DIMACS:
 17795  17796  17797  1088  17798 0
 17795  17796  17797  1088 -17799 0
 17795  17796  17797  1088  17800 0

c  -1-1 --> -2
c    ( b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧  b^{64, 17}_0 ∧ -p_1088) -> ( b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0)
c  in CNF:
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨  b^{64, 18}_2
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨  b^{64, 18}_1
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨  p_1088 ∨ -b^{64, 18}_0
c  in DIMACS:
-17795  17796 -17797  1088  17798 0
-17795  17796 -17797  1088  17799 0
-17795  17796 -17797  1088 -17800 0

c  -2-1 --> break 
c    ( b^{64, 17}_2 ∧  b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨  b^{64, 17}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-17795 -17796  17797  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 17}_2 ∧ -b^{64, 17}_1 ∧ -b^{64, 17}_0 ∧ true) 
c  in CNF:
c    -b^{64, 17}_2 ∨  b^{64, 17}_1 ∨  b^{64, 17}_0 ∨ false 
c  in DIMACS:
-17795  17796  17797  0

c  3 does not represent an automaton state.
c    -(-b^{64, 17}_2 ∧  b^{64, 17}_1 ∧  b^{64, 17}_0 ∧ true) 
c  in CNF:
c     b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ false 
c  in DIMACS:
 17795 -17796 -17797  0
c  -3 does not represent an automaton state.
c    -( b^{64, 17}_2 ∧  b^{64, 17}_1 ∧  b^{64, 17}_0 ∧ true) 
c  in CNF:
c    -b^{64, 17}_2 ∨ -b^{64, 17}_1 ∨ -b^{64, 17}_0 ∨ false 
c  in DIMACS:
-17795 -17796 -17797  0

c i = 18
c  -2+1 --> -1
c    ( b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧  p_1152) -> ( b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧  b^{64, 19}_0)
c  in CNF:
c    -b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨  b^{64, 19}_2
c    -b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_1
c    -b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨  b^{64, 19}_0
c  in DIMACS:
-17798 -17799  17800 -1152  17801 0
-17798 -17799  17800 -1152 -17802 0
-17798 -17799  17800 -1152  17803 0

c  -1+1 --> 0
c    ( b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0 ∧  p_1152) -> (-b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧ -b^{64, 19}_0)
c  in CNF:
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_2
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_1
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_0
c  in DIMACS:
-17798  17799 -17800 -1152 -17801 0
-17798  17799 -17800 -1152 -17802 0
-17798  17799 -17800 -1152 -17803 0

c  0+1 --> 1
c    (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧  p_1152) -> (-b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧  b^{64, 19}_0)
c  in CNF:
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_2
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_1
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨  b^{64, 19}_0
c  in DIMACS:
 17798  17799  17800 -1152 -17801 0
 17798  17799  17800 -1152 -17802 0
 17798  17799  17800 -1152  17803 0

c  1+1 --> 2
c    (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0 ∧  p_1152) -> (-b^{64, 19}_2 ∧  b^{64, 19}_1 ∧ -b^{64, 19}_0)
c  in CNF:
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_2
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨  b^{64, 19}_1
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ -p_1152 ∨ -b^{64, 19}_0
c  in DIMACS:
 17798  17799 -17800 -1152 -17801 0
 17798  17799 -17800 -1152  17802 0
 17798  17799 -17800 -1152 -17803 0

c  2+1 --> break 
c    (-b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 17798 -17799  17800 -1152 1162 0


c  2-1 --> 1
c    (-b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧ -p_1152) -> (-b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧  b^{64, 19}_0)
c  in CNF:
c     b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_2
c     b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_1
c     b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨  b^{64, 19}_0
c  in DIMACS:
 17798 -17799  17800  1152 -17801 0
 17798 -17799  17800  1152 -17802 0
 17798 -17799  17800  1152  17803 0

c  1-1 --> 0
c    (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0 ∧ -p_1152) -> (-b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧ -b^{64, 19}_0)
c  in CNF:
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_2
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_1
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_0
c  in DIMACS:
 17798  17799 -17800  1152 -17801 0
 17798  17799 -17800  1152 -17802 0
 17798  17799 -17800  1152 -17803 0

c  0-1 --> -1
c    (-b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧ -p_1152) -> ( b^{64, 19}_2 ∧ -b^{64, 19}_1 ∧  b^{64, 19}_0)
c  in CNF:
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨  b^{64, 19}_2
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_1
c     b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨  b^{64, 19}_0
c  in DIMACS:
 17798  17799  17800  1152  17801 0
 17798  17799  17800  1152 -17802 0
 17798  17799  17800  1152  17803 0

c  -1-1 --> -2
c    ( b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧  b^{64, 18}_0 ∧ -p_1152) -> ( b^{64, 19}_2 ∧  b^{64, 19}_1 ∧ -b^{64, 19}_0)
c  in CNF:
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨  b^{64, 19}_2
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨  b^{64, 19}_1
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨  p_1152 ∨ -b^{64, 19}_0
c  in DIMACS:
-17798  17799 -17800  1152  17801 0
-17798  17799 -17800  1152  17802 0
-17798  17799 -17800  1152 -17803 0

c  -2-1 --> break 
c    ( b^{64, 18}_2 ∧  b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨  b^{64, 18}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-17798 -17799  17800  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{64, 18}_2 ∧ -b^{64, 18}_1 ∧ -b^{64, 18}_0 ∧ true) 
c  in CNF:
c    -b^{64, 18}_2 ∨  b^{64, 18}_1 ∨  b^{64, 18}_0 ∨ false 
c  in DIMACS:
-17798  17799  17800  0

c  3 does not represent an automaton state.
c    -(-b^{64, 18}_2 ∧  b^{64, 18}_1 ∧  b^{64, 18}_0 ∧ true) 
c  in CNF:
c     b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ false 
c  in DIMACS:
 17798 -17799 -17800  0
c  -3 does not represent an automaton state.
c    -( b^{64, 18}_2 ∧  b^{64, 18}_1 ∧  b^{64, 18}_0 ∧ true) 
c  in CNF:
c    -b^{64, 18}_2 ∨ -b^{64, 18}_1 ∨ -b^{64, 18}_0 ∨ false 
c  in DIMACS:
-17798 -17799 -17800  0

c INIT for k = 65
c    -b^{65, 1}_2
c    -b^{65, 1}_1
c    -b^{65, 1}_0
c  in DIMACS:
-17804 0
-17805 0
-17806 0

c Transitions for k = 65
c i = 1
c  -2+1 --> -1
c    ( b^{65, 1}_2 ∧  b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧  p_65) -> ( b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0)
c  in CNF:
c    -b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨  b^{65, 2}_2
c    -b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_1
c    -b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨  b^{65, 2}_0
c  in DIMACS:
-17804 -17805  17806 -65  17807 0
-17804 -17805  17806 -65 -17808 0
-17804 -17805  17806 -65  17809 0

c  -1+1 --> 0
c    ( b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧  b^{65, 1}_0 ∧  p_65) -> (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧ -b^{65, 2}_0)
c  in CNF:
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_2
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_1
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_0
c  in DIMACS:
-17804  17805 -17806 -65 -17807 0
-17804  17805 -17806 -65 -17808 0
-17804  17805 -17806 -65 -17809 0

c  0+1 --> 1
c    (-b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧  p_65) -> (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0)
c  in CNF:
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_2
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_1
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨  b^{65, 2}_0
c  in DIMACS:
 17804  17805  17806 -65 -17807 0
 17804  17805  17806 -65 -17808 0
 17804  17805  17806 -65  17809 0

c  1+1 --> 2
c    (-b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧  b^{65, 1}_0 ∧  p_65) -> (-b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0)
c  in CNF:
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_2
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨  b^{65, 2}_1
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ -p_65 ∨ -b^{65, 2}_0
c  in DIMACS:
 17804  17805 -17806 -65 -17807 0
 17804  17805 -17806 -65  17808 0
 17804  17805 -17806 -65 -17809 0

c  2+1 --> break 
c    (-b^{65, 1}_2 ∧  b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧  p_65) -> break
c  in CNF:
c     b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ -p_65 ∨ break
c  in DIMACS:
 17804 -17805  17806 -65 1162 0


c  2-1 --> 1
c    (-b^{65, 1}_2 ∧  b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧ -p_65) -> (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0)
c  in CNF:
c     b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_2
c     b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_1
c     b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨  b^{65, 2}_0
c  in DIMACS:
 17804 -17805  17806  65 -17807 0
 17804 -17805  17806  65 -17808 0
 17804 -17805  17806  65  17809 0

c  1-1 --> 0
c    (-b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧  b^{65, 1}_0 ∧ -p_65) -> (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧ -b^{65, 2}_0)
c  in CNF:
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_2
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_1
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_0
c  in DIMACS:
 17804  17805 -17806  65 -17807 0
 17804  17805 -17806  65 -17808 0
 17804  17805 -17806  65 -17809 0

c  0-1 --> -1
c    (-b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧ -p_65) -> ( b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0)
c  in CNF:
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨  b^{65, 2}_2
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_1
c     b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨  b^{65, 2}_0
c  in DIMACS:
 17804  17805  17806  65  17807 0
 17804  17805  17806  65 -17808 0
 17804  17805  17806  65  17809 0

c  -1-1 --> -2
c    ( b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧  b^{65, 1}_0 ∧ -p_65) -> ( b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0)
c  in CNF:
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨  b^{65, 2}_2
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨  b^{65, 2}_1
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨  p_65 ∨ -b^{65, 2}_0
c  in DIMACS:
-17804  17805 -17806  65  17807 0
-17804  17805 -17806  65  17808 0
-17804  17805 -17806  65 -17809 0

c  -2-1 --> break 
c    ( b^{65, 1}_2 ∧  b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧ -p_65) -> break
c  in CNF:
c    -b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨  b^{65, 1}_0 ∨  p_65 ∨ break
c  in DIMACS:
-17804 -17805  17806  65 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 1}_2 ∧ -b^{65, 1}_1 ∧ -b^{65, 1}_0 ∧ true) 
c  in CNF:
c    -b^{65, 1}_2 ∨  b^{65, 1}_1 ∨  b^{65, 1}_0 ∨ false 
c  in DIMACS:
-17804  17805  17806  0

c  3 does not represent an automaton state.
c    -(-b^{65, 1}_2 ∧  b^{65, 1}_1 ∧  b^{65, 1}_0 ∧ true) 
c  in CNF:
c     b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ false 
c  in DIMACS:
 17804 -17805 -17806  0
c  -3 does not represent an automaton state.
c    -( b^{65, 1}_2 ∧  b^{65, 1}_1 ∧  b^{65, 1}_0 ∧ true) 
c  in CNF:
c    -b^{65, 1}_2 ∨ -b^{65, 1}_1 ∨ -b^{65, 1}_0 ∨ false 
c  in DIMACS:
-17804 -17805 -17806  0

c i = 2
c  -2+1 --> -1
c    ( b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧  p_130) -> ( b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0)
c  in CNF:
c    -b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨  b^{65, 3}_2
c    -b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_1
c    -b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨  b^{65, 3}_0
c  in DIMACS:
-17807 -17808  17809 -130  17810 0
-17807 -17808  17809 -130 -17811 0
-17807 -17808  17809 -130  17812 0

c  -1+1 --> 0
c    ( b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0 ∧  p_130) -> (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧ -b^{65, 3}_0)
c  in CNF:
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_2
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_1
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_0
c  in DIMACS:
-17807  17808 -17809 -130 -17810 0
-17807  17808 -17809 -130 -17811 0
-17807  17808 -17809 -130 -17812 0

c  0+1 --> 1
c    (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧  p_130) -> (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0)
c  in CNF:
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_2
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_1
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨  b^{65, 3}_0
c  in DIMACS:
 17807  17808  17809 -130 -17810 0
 17807  17808  17809 -130 -17811 0
 17807  17808  17809 -130  17812 0

c  1+1 --> 2
c    (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0 ∧  p_130) -> (-b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0)
c  in CNF:
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_2
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨  b^{65, 3}_1
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ -p_130 ∨ -b^{65, 3}_0
c  in DIMACS:
 17807  17808 -17809 -130 -17810 0
 17807  17808 -17809 -130  17811 0
 17807  17808 -17809 -130 -17812 0

c  2+1 --> break 
c    (-b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧  p_130) -> break
c  in CNF:
c     b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 17807 -17808  17809 -130 1162 0


c  2-1 --> 1
c    (-b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧ -p_130) -> (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0)
c  in CNF:
c     b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_2
c     b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_1
c     b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨  b^{65, 3}_0
c  in DIMACS:
 17807 -17808  17809  130 -17810 0
 17807 -17808  17809  130 -17811 0
 17807 -17808  17809  130  17812 0

c  1-1 --> 0
c    (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0 ∧ -p_130) -> (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧ -b^{65, 3}_0)
c  in CNF:
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_2
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_1
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_0
c  in DIMACS:
 17807  17808 -17809  130 -17810 0
 17807  17808 -17809  130 -17811 0
 17807  17808 -17809  130 -17812 0

c  0-1 --> -1
c    (-b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧ -p_130) -> ( b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0)
c  in CNF:
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨  b^{65, 3}_2
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_1
c     b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨  b^{65, 3}_0
c  in DIMACS:
 17807  17808  17809  130  17810 0
 17807  17808  17809  130 -17811 0
 17807  17808  17809  130  17812 0

c  -1-1 --> -2
c    ( b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧  b^{65, 2}_0 ∧ -p_130) -> ( b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0)
c  in CNF:
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨  b^{65, 3}_2
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨  b^{65, 3}_1
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨  p_130 ∨ -b^{65, 3}_0
c  in DIMACS:
-17807  17808 -17809  130  17810 0
-17807  17808 -17809  130  17811 0
-17807  17808 -17809  130 -17812 0

c  -2-1 --> break 
c    ( b^{65, 2}_2 ∧  b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨  b^{65, 2}_0 ∨  p_130 ∨ break
c  in DIMACS:
-17807 -17808  17809  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 2}_2 ∧ -b^{65, 2}_1 ∧ -b^{65, 2}_0 ∧ true) 
c  in CNF:
c    -b^{65, 2}_2 ∨  b^{65, 2}_1 ∨  b^{65, 2}_0 ∨ false 
c  in DIMACS:
-17807  17808  17809  0

c  3 does not represent an automaton state.
c    -(-b^{65, 2}_2 ∧  b^{65, 2}_1 ∧  b^{65, 2}_0 ∧ true) 
c  in CNF:
c     b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ false 
c  in DIMACS:
 17807 -17808 -17809  0
c  -3 does not represent an automaton state.
c    -( b^{65, 2}_2 ∧  b^{65, 2}_1 ∧  b^{65, 2}_0 ∧ true) 
c  in CNF:
c    -b^{65, 2}_2 ∨ -b^{65, 2}_1 ∨ -b^{65, 2}_0 ∨ false 
c  in DIMACS:
-17807 -17808 -17809  0

c i = 3
c  -2+1 --> -1
c    ( b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧  p_195) -> ( b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0)
c  in CNF:
c    -b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨  b^{65, 4}_2
c    -b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_1
c    -b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨  b^{65, 4}_0
c  in DIMACS:
-17810 -17811  17812 -195  17813 0
-17810 -17811  17812 -195 -17814 0
-17810 -17811  17812 -195  17815 0

c  -1+1 --> 0
c    ( b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0 ∧  p_195) -> (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧ -b^{65, 4}_0)
c  in CNF:
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_2
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_1
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_0
c  in DIMACS:
-17810  17811 -17812 -195 -17813 0
-17810  17811 -17812 -195 -17814 0
-17810  17811 -17812 -195 -17815 0

c  0+1 --> 1
c    (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧  p_195) -> (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0)
c  in CNF:
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_2
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_1
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨  b^{65, 4}_0
c  in DIMACS:
 17810  17811  17812 -195 -17813 0
 17810  17811  17812 -195 -17814 0
 17810  17811  17812 -195  17815 0

c  1+1 --> 2
c    (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0 ∧  p_195) -> (-b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0)
c  in CNF:
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_2
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨  b^{65, 4}_1
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ -p_195 ∨ -b^{65, 4}_0
c  in DIMACS:
 17810  17811 -17812 -195 -17813 0
 17810  17811 -17812 -195  17814 0
 17810  17811 -17812 -195 -17815 0

c  2+1 --> break 
c    (-b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧  p_195) -> break
c  in CNF:
c     b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 17810 -17811  17812 -195 1162 0


c  2-1 --> 1
c    (-b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧ -p_195) -> (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0)
c  in CNF:
c     b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_2
c     b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_1
c     b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨  b^{65, 4}_0
c  in DIMACS:
 17810 -17811  17812  195 -17813 0
 17810 -17811  17812  195 -17814 0
 17810 -17811  17812  195  17815 0

c  1-1 --> 0
c    (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0 ∧ -p_195) -> (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧ -b^{65, 4}_0)
c  in CNF:
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_2
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_1
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_0
c  in DIMACS:
 17810  17811 -17812  195 -17813 0
 17810  17811 -17812  195 -17814 0
 17810  17811 -17812  195 -17815 0

c  0-1 --> -1
c    (-b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧ -p_195) -> ( b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0)
c  in CNF:
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨  b^{65, 4}_2
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_1
c     b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨  b^{65, 4}_0
c  in DIMACS:
 17810  17811  17812  195  17813 0
 17810  17811  17812  195 -17814 0
 17810  17811  17812  195  17815 0

c  -1-1 --> -2
c    ( b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧  b^{65, 3}_0 ∧ -p_195) -> ( b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0)
c  in CNF:
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨  b^{65, 4}_2
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨  b^{65, 4}_1
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨  p_195 ∨ -b^{65, 4}_0
c  in DIMACS:
-17810  17811 -17812  195  17813 0
-17810  17811 -17812  195  17814 0
-17810  17811 -17812  195 -17815 0

c  -2-1 --> break 
c    ( b^{65, 3}_2 ∧  b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨  b^{65, 3}_0 ∨  p_195 ∨ break
c  in DIMACS:
-17810 -17811  17812  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 3}_2 ∧ -b^{65, 3}_1 ∧ -b^{65, 3}_0 ∧ true) 
c  in CNF:
c    -b^{65, 3}_2 ∨  b^{65, 3}_1 ∨  b^{65, 3}_0 ∨ false 
c  in DIMACS:
-17810  17811  17812  0

c  3 does not represent an automaton state.
c    -(-b^{65, 3}_2 ∧  b^{65, 3}_1 ∧  b^{65, 3}_0 ∧ true) 
c  in CNF:
c     b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ false 
c  in DIMACS:
 17810 -17811 -17812  0
c  -3 does not represent an automaton state.
c    -( b^{65, 3}_2 ∧  b^{65, 3}_1 ∧  b^{65, 3}_0 ∧ true) 
c  in CNF:
c    -b^{65, 3}_2 ∨ -b^{65, 3}_1 ∨ -b^{65, 3}_0 ∨ false 
c  in DIMACS:
-17810 -17811 -17812  0

c i = 4
c  -2+1 --> -1
c    ( b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧  p_260) -> ( b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0)
c  in CNF:
c    -b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨  b^{65, 5}_2
c    -b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_1
c    -b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨  b^{65, 5}_0
c  in DIMACS:
-17813 -17814  17815 -260  17816 0
-17813 -17814  17815 -260 -17817 0
-17813 -17814  17815 -260  17818 0

c  -1+1 --> 0
c    ( b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0 ∧  p_260) -> (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧ -b^{65, 5}_0)
c  in CNF:
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_2
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_1
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_0
c  in DIMACS:
-17813  17814 -17815 -260 -17816 0
-17813  17814 -17815 -260 -17817 0
-17813  17814 -17815 -260 -17818 0

c  0+1 --> 1
c    (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧  p_260) -> (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0)
c  in CNF:
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_2
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_1
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨  b^{65, 5}_0
c  in DIMACS:
 17813  17814  17815 -260 -17816 0
 17813  17814  17815 -260 -17817 0
 17813  17814  17815 -260  17818 0

c  1+1 --> 2
c    (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0 ∧  p_260) -> (-b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0)
c  in CNF:
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_2
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨  b^{65, 5}_1
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ -p_260 ∨ -b^{65, 5}_0
c  in DIMACS:
 17813  17814 -17815 -260 -17816 0
 17813  17814 -17815 -260  17817 0
 17813  17814 -17815 -260 -17818 0

c  2+1 --> break 
c    (-b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧  p_260) -> break
c  in CNF:
c     b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 17813 -17814  17815 -260 1162 0


c  2-1 --> 1
c    (-b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧ -p_260) -> (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0)
c  in CNF:
c     b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_2
c     b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_1
c     b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨  b^{65, 5}_0
c  in DIMACS:
 17813 -17814  17815  260 -17816 0
 17813 -17814  17815  260 -17817 0
 17813 -17814  17815  260  17818 0

c  1-1 --> 0
c    (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0 ∧ -p_260) -> (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧ -b^{65, 5}_0)
c  in CNF:
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_2
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_1
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_0
c  in DIMACS:
 17813  17814 -17815  260 -17816 0
 17813  17814 -17815  260 -17817 0
 17813  17814 -17815  260 -17818 0

c  0-1 --> -1
c    (-b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧ -p_260) -> ( b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0)
c  in CNF:
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨  b^{65, 5}_2
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_1
c     b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨  b^{65, 5}_0
c  in DIMACS:
 17813  17814  17815  260  17816 0
 17813  17814  17815  260 -17817 0
 17813  17814  17815  260  17818 0

c  -1-1 --> -2
c    ( b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧  b^{65, 4}_0 ∧ -p_260) -> ( b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0)
c  in CNF:
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨  b^{65, 5}_2
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨  b^{65, 5}_1
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨  p_260 ∨ -b^{65, 5}_0
c  in DIMACS:
-17813  17814 -17815  260  17816 0
-17813  17814 -17815  260  17817 0
-17813  17814 -17815  260 -17818 0

c  -2-1 --> break 
c    ( b^{65, 4}_2 ∧  b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨  b^{65, 4}_0 ∨  p_260 ∨ break
c  in DIMACS:
-17813 -17814  17815  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 4}_2 ∧ -b^{65, 4}_1 ∧ -b^{65, 4}_0 ∧ true) 
c  in CNF:
c    -b^{65, 4}_2 ∨  b^{65, 4}_1 ∨  b^{65, 4}_0 ∨ false 
c  in DIMACS:
-17813  17814  17815  0

c  3 does not represent an automaton state.
c    -(-b^{65, 4}_2 ∧  b^{65, 4}_1 ∧  b^{65, 4}_0 ∧ true) 
c  in CNF:
c     b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ false 
c  in DIMACS:
 17813 -17814 -17815  0
c  -3 does not represent an automaton state.
c    -( b^{65, 4}_2 ∧  b^{65, 4}_1 ∧  b^{65, 4}_0 ∧ true) 
c  in CNF:
c    -b^{65, 4}_2 ∨ -b^{65, 4}_1 ∨ -b^{65, 4}_0 ∨ false 
c  in DIMACS:
-17813 -17814 -17815  0

c i = 5
c  -2+1 --> -1
c    ( b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧  p_325) -> ( b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0)
c  in CNF:
c    -b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨  b^{65, 6}_2
c    -b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_1
c    -b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨  b^{65, 6}_0
c  in DIMACS:
-17816 -17817  17818 -325  17819 0
-17816 -17817  17818 -325 -17820 0
-17816 -17817  17818 -325  17821 0

c  -1+1 --> 0
c    ( b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0 ∧  p_325) -> (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧ -b^{65, 6}_0)
c  in CNF:
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_2
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_1
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_0
c  in DIMACS:
-17816  17817 -17818 -325 -17819 0
-17816  17817 -17818 -325 -17820 0
-17816  17817 -17818 -325 -17821 0

c  0+1 --> 1
c    (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧  p_325) -> (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0)
c  in CNF:
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_2
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_1
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨  b^{65, 6}_0
c  in DIMACS:
 17816  17817  17818 -325 -17819 0
 17816  17817  17818 -325 -17820 0
 17816  17817  17818 -325  17821 0

c  1+1 --> 2
c    (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0 ∧  p_325) -> (-b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0)
c  in CNF:
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_2
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨  b^{65, 6}_1
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ -p_325 ∨ -b^{65, 6}_0
c  in DIMACS:
 17816  17817 -17818 -325 -17819 0
 17816  17817 -17818 -325  17820 0
 17816  17817 -17818 -325 -17821 0

c  2+1 --> break 
c    (-b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧  p_325) -> break
c  in CNF:
c     b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 17816 -17817  17818 -325 1162 0


c  2-1 --> 1
c    (-b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧ -p_325) -> (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0)
c  in CNF:
c     b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_2
c     b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_1
c     b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨  b^{65, 6}_0
c  in DIMACS:
 17816 -17817  17818  325 -17819 0
 17816 -17817  17818  325 -17820 0
 17816 -17817  17818  325  17821 0

c  1-1 --> 0
c    (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0 ∧ -p_325) -> (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧ -b^{65, 6}_0)
c  in CNF:
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_2
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_1
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_0
c  in DIMACS:
 17816  17817 -17818  325 -17819 0
 17816  17817 -17818  325 -17820 0
 17816  17817 -17818  325 -17821 0

c  0-1 --> -1
c    (-b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧ -p_325) -> ( b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0)
c  in CNF:
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨  b^{65, 6}_2
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_1
c     b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨  b^{65, 6}_0
c  in DIMACS:
 17816  17817  17818  325  17819 0
 17816  17817  17818  325 -17820 0
 17816  17817  17818  325  17821 0

c  -1-1 --> -2
c    ( b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧  b^{65, 5}_0 ∧ -p_325) -> ( b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0)
c  in CNF:
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨  b^{65, 6}_2
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨  b^{65, 6}_1
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨  p_325 ∨ -b^{65, 6}_0
c  in DIMACS:
-17816  17817 -17818  325  17819 0
-17816  17817 -17818  325  17820 0
-17816  17817 -17818  325 -17821 0

c  -2-1 --> break 
c    ( b^{65, 5}_2 ∧  b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨  b^{65, 5}_0 ∨  p_325 ∨ break
c  in DIMACS:
-17816 -17817  17818  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 5}_2 ∧ -b^{65, 5}_1 ∧ -b^{65, 5}_0 ∧ true) 
c  in CNF:
c    -b^{65, 5}_2 ∨  b^{65, 5}_1 ∨  b^{65, 5}_0 ∨ false 
c  in DIMACS:
-17816  17817  17818  0

c  3 does not represent an automaton state.
c    -(-b^{65, 5}_2 ∧  b^{65, 5}_1 ∧  b^{65, 5}_0 ∧ true) 
c  in CNF:
c     b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ false 
c  in DIMACS:
 17816 -17817 -17818  0
c  -3 does not represent an automaton state.
c    -( b^{65, 5}_2 ∧  b^{65, 5}_1 ∧  b^{65, 5}_0 ∧ true) 
c  in CNF:
c    -b^{65, 5}_2 ∨ -b^{65, 5}_1 ∨ -b^{65, 5}_0 ∨ false 
c  in DIMACS:
-17816 -17817 -17818  0

c i = 6
c  -2+1 --> -1
c    ( b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧  p_390) -> ( b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0)
c  in CNF:
c    -b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨  b^{65, 7}_2
c    -b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_1
c    -b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨  b^{65, 7}_0
c  in DIMACS:
-17819 -17820  17821 -390  17822 0
-17819 -17820  17821 -390 -17823 0
-17819 -17820  17821 -390  17824 0

c  -1+1 --> 0
c    ( b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0 ∧  p_390) -> (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧ -b^{65, 7}_0)
c  in CNF:
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_2
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_1
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_0
c  in DIMACS:
-17819  17820 -17821 -390 -17822 0
-17819  17820 -17821 -390 -17823 0
-17819  17820 -17821 -390 -17824 0

c  0+1 --> 1
c    (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧  p_390) -> (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0)
c  in CNF:
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_2
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_1
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨  b^{65, 7}_0
c  in DIMACS:
 17819  17820  17821 -390 -17822 0
 17819  17820  17821 -390 -17823 0
 17819  17820  17821 -390  17824 0

c  1+1 --> 2
c    (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0 ∧  p_390) -> (-b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0)
c  in CNF:
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_2
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨  b^{65, 7}_1
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ -p_390 ∨ -b^{65, 7}_0
c  in DIMACS:
 17819  17820 -17821 -390 -17822 0
 17819  17820 -17821 -390  17823 0
 17819  17820 -17821 -390 -17824 0

c  2+1 --> break 
c    (-b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧  p_390) -> break
c  in CNF:
c     b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 17819 -17820  17821 -390 1162 0


c  2-1 --> 1
c    (-b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧ -p_390) -> (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0)
c  in CNF:
c     b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_2
c     b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_1
c     b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨  b^{65, 7}_0
c  in DIMACS:
 17819 -17820  17821  390 -17822 0
 17819 -17820  17821  390 -17823 0
 17819 -17820  17821  390  17824 0

c  1-1 --> 0
c    (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0 ∧ -p_390) -> (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧ -b^{65, 7}_0)
c  in CNF:
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_2
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_1
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_0
c  in DIMACS:
 17819  17820 -17821  390 -17822 0
 17819  17820 -17821  390 -17823 0
 17819  17820 -17821  390 -17824 0

c  0-1 --> -1
c    (-b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧ -p_390) -> ( b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0)
c  in CNF:
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨  b^{65, 7}_2
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_1
c     b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨  b^{65, 7}_0
c  in DIMACS:
 17819  17820  17821  390  17822 0
 17819  17820  17821  390 -17823 0
 17819  17820  17821  390  17824 0

c  -1-1 --> -2
c    ( b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧  b^{65, 6}_0 ∧ -p_390) -> ( b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0)
c  in CNF:
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨  b^{65, 7}_2
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨  b^{65, 7}_1
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨  p_390 ∨ -b^{65, 7}_0
c  in DIMACS:
-17819  17820 -17821  390  17822 0
-17819  17820 -17821  390  17823 0
-17819  17820 -17821  390 -17824 0

c  -2-1 --> break 
c    ( b^{65, 6}_2 ∧  b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨  b^{65, 6}_0 ∨  p_390 ∨ break
c  in DIMACS:
-17819 -17820  17821  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 6}_2 ∧ -b^{65, 6}_1 ∧ -b^{65, 6}_0 ∧ true) 
c  in CNF:
c    -b^{65, 6}_2 ∨  b^{65, 6}_1 ∨  b^{65, 6}_0 ∨ false 
c  in DIMACS:
-17819  17820  17821  0

c  3 does not represent an automaton state.
c    -(-b^{65, 6}_2 ∧  b^{65, 6}_1 ∧  b^{65, 6}_0 ∧ true) 
c  in CNF:
c     b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ false 
c  in DIMACS:
 17819 -17820 -17821  0
c  -3 does not represent an automaton state.
c    -( b^{65, 6}_2 ∧  b^{65, 6}_1 ∧  b^{65, 6}_0 ∧ true) 
c  in CNF:
c    -b^{65, 6}_2 ∨ -b^{65, 6}_1 ∨ -b^{65, 6}_0 ∨ false 
c  in DIMACS:
-17819 -17820 -17821  0

c i = 7
c  -2+1 --> -1
c    ( b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧  p_455) -> ( b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0)
c  in CNF:
c    -b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨  b^{65, 8}_2
c    -b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_1
c    -b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨  b^{65, 8}_0
c  in DIMACS:
-17822 -17823  17824 -455  17825 0
-17822 -17823  17824 -455 -17826 0
-17822 -17823  17824 -455  17827 0

c  -1+1 --> 0
c    ( b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0 ∧  p_455) -> (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧ -b^{65, 8}_0)
c  in CNF:
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_2
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_1
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_0
c  in DIMACS:
-17822  17823 -17824 -455 -17825 0
-17822  17823 -17824 -455 -17826 0
-17822  17823 -17824 -455 -17827 0

c  0+1 --> 1
c    (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧  p_455) -> (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0)
c  in CNF:
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_2
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_1
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨  b^{65, 8}_0
c  in DIMACS:
 17822  17823  17824 -455 -17825 0
 17822  17823  17824 -455 -17826 0
 17822  17823  17824 -455  17827 0

c  1+1 --> 2
c    (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0 ∧  p_455) -> (-b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0)
c  in CNF:
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_2
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨  b^{65, 8}_1
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ -p_455 ∨ -b^{65, 8}_0
c  in DIMACS:
 17822  17823 -17824 -455 -17825 0
 17822  17823 -17824 -455  17826 0
 17822  17823 -17824 -455 -17827 0

c  2+1 --> break 
c    (-b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧  p_455) -> break
c  in CNF:
c     b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 17822 -17823  17824 -455 1162 0


c  2-1 --> 1
c    (-b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧ -p_455) -> (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0)
c  in CNF:
c     b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_2
c     b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_1
c     b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨  b^{65, 8}_0
c  in DIMACS:
 17822 -17823  17824  455 -17825 0
 17822 -17823  17824  455 -17826 0
 17822 -17823  17824  455  17827 0

c  1-1 --> 0
c    (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0 ∧ -p_455) -> (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧ -b^{65, 8}_0)
c  in CNF:
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_2
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_1
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_0
c  in DIMACS:
 17822  17823 -17824  455 -17825 0
 17822  17823 -17824  455 -17826 0
 17822  17823 -17824  455 -17827 0

c  0-1 --> -1
c    (-b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧ -p_455) -> ( b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0)
c  in CNF:
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨  b^{65, 8}_2
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_1
c     b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨  b^{65, 8}_0
c  in DIMACS:
 17822  17823  17824  455  17825 0
 17822  17823  17824  455 -17826 0
 17822  17823  17824  455  17827 0

c  -1-1 --> -2
c    ( b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧  b^{65, 7}_0 ∧ -p_455) -> ( b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0)
c  in CNF:
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨  b^{65, 8}_2
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨  b^{65, 8}_1
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨  p_455 ∨ -b^{65, 8}_0
c  in DIMACS:
-17822  17823 -17824  455  17825 0
-17822  17823 -17824  455  17826 0
-17822  17823 -17824  455 -17827 0

c  -2-1 --> break 
c    ( b^{65, 7}_2 ∧  b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨  b^{65, 7}_0 ∨  p_455 ∨ break
c  in DIMACS:
-17822 -17823  17824  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 7}_2 ∧ -b^{65, 7}_1 ∧ -b^{65, 7}_0 ∧ true) 
c  in CNF:
c    -b^{65, 7}_2 ∨  b^{65, 7}_1 ∨  b^{65, 7}_0 ∨ false 
c  in DIMACS:
-17822  17823  17824  0

c  3 does not represent an automaton state.
c    -(-b^{65, 7}_2 ∧  b^{65, 7}_1 ∧  b^{65, 7}_0 ∧ true) 
c  in CNF:
c     b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ false 
c  in DIMACS:
 17822 -17823 -17824  0
c  -3 does not represent an automaton state.
c    -( b^{65, 7}_2 ∧  b^{65, 7}_1 ∧  b^{65, 7}_0 ∧ true) 
c  in CNF:
c    -b^{65, 7}_2 ∨ -b^{65, 7}_1 ∨ -b^{65, 7}_0 ∨ false 
c  in DIMACS:
-17822 -17823 -17824  0

c i = 8
c  -2+1 --> -1
c    ( b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧  p_520) -> ( b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0)
c  in CNF:
c    -b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨  b^{65, 9}_2
c    -b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_1
c    -b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨  b^{65, 9}_0
c  in DIMACS:
-17825 -17826  17827 -520  17828 0
-17825 -17826  17827 -520 -17829 0
-17825 -17826  17827 -520  17830 0

c  -1+1 --> 0
c    ( b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0 ∧  p_520) -> (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧ -b^{65, 9}_0)
c  in CNF:
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_2
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_1
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_0
c  in DIMACS:
-17825  17826 -17827 -520 -17828 0
-17825  17826 -17827 -520 -17829 0
-17825  17826 -17827 -520 -17830 0

c  0+1 --> 1
c    (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧  p_520) -> (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0)
c  in CNF:
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_2
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_1
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨  b^{65, 9}_0
c  in DIMACS:
 17825  17826  17827 -520 -17828 0
 17825  17826  17827 -520 -17829 0
 17825  17826  17827 -520  17830 0

c  1+1 --> 2
c    (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0 ∧  p_520) -> (-b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0)
c  in CNF:
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_2
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨  b^{65, 9}_1
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ -p_520 ∨ -b^{65, 9}_0
c  in DIMACS:
 17825  17826 -17827 -520 -17828 0
 17825  17826 -17827 -520  17829 0
 17825  17826 -17827 -520 -17830 0

c  2+1 --> break 
c    (-b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧  p_520) -> break
c  in CNF:
c     b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 17825 -17826  17827 -520 1162 0


c  2-1 --> 1
c    (-b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧ -p_520) -> (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0)
c  in CNF:
c     b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_2
c     b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_1
c     b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨  b^{65, 9}_0
c  in DIMACS:
 17825 -17826  17827  520 -17828 0
 17825 -17826  17827  520 -17829 0
 17825 -17826  17827  520  17830 0

c  1-1 --> 0
c    (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0 ∧ -p_520) -> (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧ -b^{65, 9}_0)
c  in CNF:
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_2
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_1
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_0
c  in DIMACS:
 17825  17826 -17827  520 -17828 0
 17825  17826 -17827  520 -17829 0
 17825  17826 -17827  520 -17830 0

c  0-1 --> -1
c    (-b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧ -p_520) -> ( b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0)
c  in CNF:
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨  b^{65, 9}_2
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_1
c     b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨  b^{65, 9}_0
c  in DIMACS:
 17825  17826  17827  520  17828 0
 17825  17826  17827  520 -17829 0
 17825  17826  17827  520  17830 0

c  -1-1 --> -2
c    ( b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧  b^{65, 8}_0 ∧ -p_520) -> ( b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0)
c  in CNF:
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨  b^{65, 9}_2
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨  b^{65, 9}_1
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨  p_520 ∨ -b^{65, 9}_0
c  in DIMACS:
-17825  17826 -17827  520  17828 0
-17825  17826 -17827  520  17829 0
-17825  17826 -17827  520 -17830 0

c  -2-1 --> break 
c    ( b^{65, 8}_2 ∧  b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨  b^{65, 8}_0 ∨  p_520 ∨ break
c  in DIMACS:
-17825 -17826  17827  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 8}_2 ∧ -b^{65, 8}_1 ∧ -b^{65, 8}_0 ∧ true) 
c  in CNF:
c    -b^{65, 8}_2 ∨  b^{65, 8}_1 ∨  b^{65, 8}_0 ∨ false 
c  in DIMACS:
-17825  17826  17827  0

c  3 does not represent an automaton state.
c    -(-b^{65, 8}_2 ∧  b^{65, 8}_1 ∧  b^{65, 8}_0 ∧ true) 
c  in CNF:
c     b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ false 
c  in DIMACS:
 17825 -17826 -17827  0
c  -3 does not represent an automaton state.
c    -( b^{65, 8}_2 ∧  b^{65, 8}_1 ∧  b^{65, 8}_0 ∧ true) 
c  in CNF:
c    -b^{65, 8}_2 ∨ -b^{65, 8}_1 ∨ -b^{65, 8}_0 ∨ false 
c  in DIMACS:
-17825 -17826 -17827  0

c i = 9
c  -2+1 --> -1
c    ( b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧  p_585) -> ( b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0)
c  in CNF:
c    -b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨  b^{65, 10}_2
c    -b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_1
c    -b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨  b^{65, 10}_0
c  in DIMACS:
-17828 -17829  17830 -585  17831 0
-17828 -17829  17830 -585 -17832 0
-17828 -17829  17830 -585  17833 0

c  -1+1 --> 0
c    ( b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0 ∧  p_585) -> (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧ -b^{65, 10}_0)
c  in CNF:
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_2
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_1
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_0
c  in DIMACS:
-17828  17829 -17830 -585 -17831 0
-17828  17829 -17830 -585 -17832 0
-17828  17829 -17830 -585 -17833 0

c  0+1 --> 1
c    (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧  p_585) -> (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0)
c  in CNF:
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_2
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_1
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨  b^{65, 10}_0
c  in DIMACS:
 17828  17829  17830 -585 -17831 0
 17828  17829  17830 -585 -17832 0
 17828  17829  17830 -585  17833 0

c  1+1 --> 2
c    (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0 ∧  p_585) -> (-b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0)
c  in CNF:
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_2
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨  b^{65, 10}_1
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ -p_585 ∨ -b^{65, 10}_0
c  in DIMACS:
 17828  17829 -17830 -585 -17831 0
 17828  17829 -17830 -585  17832 0
 17828  17829 -17830 -585 -17833 0

c  2+1 --> break 
c    (-b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧  p_585) -> break
c  in CNF:
c     b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 17828 -17829  17830 -585 1162 0


c  2-1 --> 1
c    (-b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧ -p_585) -> (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0)
c  in CNF:
c     b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_2
c     b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_1
c     b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨  b^{65, 10}_0
c  in DIMACS:
 17828 -17829  17830  585 -17831 0
 17828 -17829  17830  585 -17832 0
 17828 -17829  17830  585  17833 0

c  1-1 --> 0
c    (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0 ∧ -p_585) -> (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧ -b^{65, 10}_0)
c  in CNF:
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_2
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_1
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_0
c  in DIMACS:
 17828  17829 -17830  585 -17831 0
 17828  17829 -17830  585 -17832 0
 17828  17829 -17830  585 -17833 0

c  0-1 --> -1
c    (-b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧ -p_585) -> ( b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0)
c  in CNF:
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨  b^{65, 10}_2
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_1
c     b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨  b^{65, 10}_0
c  in DIMACS:
 17828  17829  17830  585  17831 0
 17828  17829  17830  585 -17832 0
 17828  17829  17830  585  17833 0

c  -1-1 --> -2
c    ( b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧  b^{65, 9}_0 ∧ -p_585) -> ( b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0)
c  in CNF:
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨  b^{65, 10}_2
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨  b^{65, 10}_1
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨  p_585 ∨ -b^{65, 10}_0
c  in DIMACS:
-17828  17829 -17830  585  17831 0
-17828  17829 -17830  585  17832 0
-17828  17829 -17830  585 -17833 0

c  -2-1 --> break 
c    ( b^{65, 9}_2 ∧  b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨  b^{65, 9}_0 ∨  p_585 ∨ break
c  in DIMACS:
-17828 -17829  17830  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 9}_2 ∧ -b^{65, 9}_1 ∧ -b^{65, 9}_0 ∧ true) 
c  in CNF:
c    -b^{65, 9}_2 ∨  b^{65, 9}_1 ∨  b^{65, 9}_0 ∨ false 
c  in DIMACS:
-17828  17829  17830  0

c  3 does not represent an automaton state.
c    -(-b^{65, 9}_2 ∧  b^{65, 9}_1 ∧  b^{65, 9}_0 ∧ true) 
c  in CNF:
c     b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ false 
c  in DIMACS:
 17828 -17829 -17830  0
c  -3 does not represent an automaton state.
c    -( b^{65, 9}_2 ∧  b^{65, 9}_1 ∧  b^{65, 9}_0 ∧ true) 
c  in CNF:
c    -b^{65, 9}_2 ∨ -b^{65, 9}_1 ∨ -b^{65, 9}_0 ∨ false 
c  in DIMACS:
-17828 -17829 -17830  0

c i = 10
c  -2+1 --> -1
c    ( b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧  p_650) -> ( b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0)
c  in CNF:
c    -b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨  b^{65, 11}_2
c    -b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_1
c    -b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨  b^{65, 11}_0
c  in DIMACS:
-17831 -17832  17833 -650  17834 0
-17831 -17832  17833 -650 -17835 0
-17831 -17832  17833 -650  17836 0

c  -1+1 --> 0
c    ( b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0 ∧  p_650) -> (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧ -b^{65, 11}_0)
c  in CNF:
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_2
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_1
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_0
c  in DIMACS:
-17831  17832 -17833 -650 -17834 0
-17831  17832 -17833 -650 -17835 0
-17831  17832 -17833 -650 -17836 0

c  0+1 --> 1
c    (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧  p_650) -> (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0)
c  in CNF:
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_2
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_1
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨  b^{65, 11}_0
c  in DIMACS:
 17831  17832  17833 -650 -17834 0
 17831  17832  17833 -650 -17835 0
 17831  17832  17833 -650  17836 0

c  1+1 --> 2
c    (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0 ∧  p_650) -> (-b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0)
c  in CNF:
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_2
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨  b^{65, 11}_1
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ -p_650 ∨ -b^{65, 11}_0
c  in DIMACS:
 17831  17832 -17833 -650 -17834 0
 17831  17832 -17833 -650  17835 0
 17831  17832 -17833 -650 -17836 0

c  2+1 --> break 
c    (-b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧  p_650) -> break
c  in CNF:
c     b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 17831 -17832  17833 -650 1162 0


c  2-1 --> 1
c    (-b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧ -p_650) -> (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0)
c  in CNF:
c     b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_2
c     b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_1
c     b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨  b^{65, 11}_0
c  in DIMACS:
 17831 -17832  17833  650 -17834 0
 17831 -17832  17833  650 -17835 0
 17831 -17832  17833  650  17836 0

c  1-1 --> 0
c    (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0 ∧ -p_650) -> (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧ -b^{65, 11}_0)
c  in CNF:
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_2
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_1
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_0
c  in DIMACS:
 17831  17832 -17833  650 -17834 0
 17831  17832 -17833  650 -17835 0
 17831  17832 -17833  650 -17836 0

c  0-1 --> -1
c    (-b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧ -p_650) -> ( b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0)
c  in CNF:
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨  b^{65, 11}_2
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_1
c     b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨  b^{65, 11}_0
c  in DIMACS:
 17831  17832  17833  650  17834 0
 17831  17832  17833  650 -17835 0
 17831  17832  17833  650  17836 0

c  -1-1 --> -2
c    ( b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧  b^{65, 10}_0 ∧ -p_650) -> ( b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0)
c  in CNF:
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨  b^{65, 11}_2
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨  b^{65, 11}_1
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨  p_650 ∨ -b^{65, 11}_0
c  in DIMACS:
-17831  17832 -17833  650  17834 0
-17831  17832 -17833  650  17835 0
-17831  17832 -17833  650 -17836 0

c  -2-1 --> break 
c    ( b^{65, 10}_2 ∧  b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨  b^{65, 10}_0 ∨  p_650 ∨ break
c  in DIMACS:
-17831 -17832  17833  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 10}_2 ∧ -b^{65, 10}_1 ∧ -b^{65, 10}_0 ∧ true) 
c  in CNF:
c    -b^{65, 10}_2 ∨  b^{65, 10}_1 ∨  b^{65, 10}_0 ∨ false 
c  in DIMACS:
-17831  17832  17833  0

c  3 does not represent an automaton state.
c    -(-b^{65, 10}_2 ∧  b^{65, 10}_1 ∧  b^{65, 10}_0 ∧ true) 
c  in CNF:
c     b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ false 
c  in DIMACS:
 17831 -17832 -17833  0
c  -3 does not represent an automaton state.
c    -( b^{65, 10}_2 ∧  b^{65, 10}_1 ∧  b^{65, 10}_0 ∧ true) 
c  in CNF:
c    -b^{65, 10}_2 ∨ -b^{65, 10}_1 ∨ -b^{65, 10}_0 ∨ false 
c  in DIMACS:
-17831 -17832 -17833  0

c i = 11
c  -2+1 --> -1
c    ( b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧  p_715) -> ( b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0)
c  in CNF:
c    -b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨  b^{65, 12}_2
c    -b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_1
c    -b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨  b^{65, 12}_0
c  in DIMACS:
-17834 -17835  17836 -715  17837 0
-17834 -17835  17836 -715 -17838 0
-17834 -17835  17836 -715  17839 0

c  -1+1 --> 0
c    ( b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0 ∧  p_715) -> (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧ -b^{65, 12}_0)
c  in CNF:
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_2
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_1
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_0
c  in DIMACS:
-17834  17835 -17836 -715 -17837 0
-17834  17835 -17836 -715 -17838 0
-17834  17835 -17836 -715 -17839 0

c  0+1 --> 1
c    (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧  p_715) -> (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0)
c  in CNF:
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_2
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_1
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨  b^{65, 12}_0
c  in DIMACS:
 17834  17835  17836 -715 -17837 0
 17834  17835  17836 -715 -17838 0
 17834  17835  17836 -715  17839 0

c  1+1 --> 2
c    (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0 ∧  p_715) -> (-b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0)
c  in CNF:
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_2
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨  b^{65, 12}_1
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ -p_715 ∨ -b^{65, 12}_0
c  in DIMACS:
 17834  17835 -17836 -715 -17837 0
 17834  17835 -17836 -715  17838 0
 17834  17835 -17836 -715 -17839 0

c  2+1 --> break 
c    (-b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧  p_715) -> break
c  in CNF:
c     b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 17834 -17835  17836 -715 1162 0


c  2-1 --> 1
c    (-b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧ -p_715) -> (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0)
c  in CNF:
c     b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_2
c     b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_1
c     b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨  b^{65, 12}_0
c  in DIMACS:
 17834 -17835  17836  715 -17837 0
 17834 -17835  17836  715 -17838 0
 17834 -17835  17836  715  17839 0

c  1-1 --> 0
c    (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0 ∧ -p_715) -> (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧ -b^{65, 12}_0)
c  in CNF:
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_2
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_1
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_0
c  in DIMACS:
 17834  17835 -17836  715 -17837 0
 17834  17835 -17836  715 -17838 0
 17834  17835 -17836  715 -17839 0

c  0-1 --> -1
c    (-b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧ -p_715) -> ( b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0)
c  in CNF:
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨  b^{65, 12}_2
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_1
c     b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨  b^{65, 12}_0
c  in DIMACS:
 17834  17835  17836  715  17837 0
 17834  17835  17836  715 -17838 0
 17834  17835  17836  715  17839 0

c  -1-1 --> -2
c    ( b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧  b^{65, 11}_0 ∧ -p_715) -> ( b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0)
c  in CNF:
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨  b^{65, 12}_2
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨  b^{65, 12}_1
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨  p_715 ∨ -b^{65, 12}_0
c  in DIMACS:
-17834  17835 -17836  715  17837 0
-17834  17835 -17836  715  17838 0
-17834  17835 -17836  715 -17839 0

c  -2-1 --> break 
c    ( b^{65, 11}_2 ∧  b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨  b^{65, 11}_0 ∨  p_715 ∨ break
c  in DIMACS:
-17834 -17835  17836  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 11}_2 ∧ -b^{65, 11}_1 ∧ -b^{65, 11}_0 ∧ true) 
c  in CNF:
c    -b^{65, 11}_2 ∨  b^{65, 11}_1 ∨  b^{65, 11}_0 ∨ false 
c  in DIMACS:
-17834  17835  17836  0

c  3 does not represent an automaton state.
c    -(-b^{65, 11}_2 ∧  b^{65, 11}_1 ∧  b^{65, 11}_0 ∧ true) 
c  in CNF:
c     b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ false 
c  in DIMACS:
 17834 -17835 -17836  0
c  -3 does not represent an automaton state.
c    -( b^{65, 11}_2 ∧  b^{65, 11}_1 ∧  b^{65, 11}_0 ∧ true) 
c  in CNF:
c    -b^{65, 11}_2 ∨ -b^{65, 11}_1 ∨ -b^{65, 11}_0 ∨ false 
c  in DIMACS:
-17834 -17835 -17836  0

c i = 12
c  -2+1 --> -1
c    ( b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧  p_780) -> ( b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0)
c  in CNF:
c    -b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨  b^{65, 13}_2
c    -b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_1
c    -b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨  b^{65, 13}_0
c  in DIMACS:
-17837 -17838  17839 -780  17840 0
-17837 -17838  17839 -780 -17841 0
-17837 -17838  17839 -780  17842 0

c  -1+1 --> 0
c    ( b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0 ∧  p_780) -> (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧ -b^{65, 13}_0)
c  in CNF:
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_2
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_1
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_0
c  in DIMACS:
-17837  17838 -17839 -780 -17840 0
-17837  17838 -17839 -780 -17841 0
-17837  17838 -17839 -780 -17842 0

c  0+1 --> 1
c    (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧  p_780) -> (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0)
c  in CNF:
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_2
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_1
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨  b^{65, 13}_0
c  in DIMACS:
 17837  17838  17839 -780 -17840 0
 17837  17838  17839 -780 -17841 0
 17837  17838  17839 -780  17842 0

c  1+1 --> 2
c    (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0 ∧  p_780) -> (-b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0)
c  in CNF:
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_2
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨  b^{65, 13}_1
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ -p_780 ∨ -b^{65, 13}_0
c  in DIMACS:
 17837  17838 -17839 -780 -17840 0
 17837  17838 -17839 -780  17841 0
 17837  17838 -17839 -780 -17842 0

c  2+1 --> break 
c    (-b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧  p_780) -> break
c  in CNF:
c     b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 17837 -17838  17839 -780 1162 0


c  2-1 --> 1
c    (-b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧ -p_780) -> (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0)
c  in CNF:
c     b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_2
c     b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_1
c     b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨  b^{65, 13}_0
c  in DIMACS:
 17837 -17838  17839  780 -17840 0
 17837 -17838  17839  780 -17841 0
 17837 -17838  17839  780  17842 0

c  1-1 --> 0
c    (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0 ∧ -p_780) -> (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧ -b^{65, 13}_0)
c  in CNF:
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_2
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_1
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_0
c  in DIMACS:
 17837  17838 -17839  780 -17840 0
 17837  17838 -17839  780 -17841 0
 17837  17838 -17839  780 -17842 0

c  0-1 --> -1
c    (-b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧ -p_780) -> ( b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0)
c  in CNF:
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨  b^{65, 13}_2
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_1
c     b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨  b^{65, 13}_0
c  in DIMACS:
 17837  17838  17839  780  17840 0
 17837  17838  17839  780 -17841 0
 17837  17838  17839  780  17842 0

c  -1-1 --> -2
c    ( b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧  b^{65, 12}_0 ∧ -p_780) -> ( b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0)
c  in CNF:
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨  b^{65, 13}_2
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨  b^{65, 13}_1
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨  p_780 ∨ -b^{65, 13}_0
c  in DIMACS:
-17837  17838 -17839  780  17840 0
-17837  17838 -17839  780  17841 0
-17837  17838 -17839  780 -17842 0

c  -2-1 --> break 
c    ( b^{65, 12}_2 ∧  b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨  b^{65, 12}_0 ∨  p_780 ∨ break
c  in DIMACS:
-17837 -17838  17839  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 12}_2 ∧ -b^{65, 12}_1 ∧ -b^{65, 12}_0 ∧ true) 
c  in CNF:
c    -b^{65, 12}_2 ∨  b^{65, 12}_1 ∨  b^{65, 12}_0 ∨ false 
c  in DIMACS:
-17837  17838  17839  0

c  3 does not represent an automaton state.
c    -(-b^{65, 12}_2 ∧  b^{65, 12}_1 ∧  b^{65, 12}_0 ∧ true) 
c  in CNF:
c     b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ false 
c  in DIMACS:
 17837 -17838 -17839  0
c  -3 does not represent an automaton state.
c    -( b^{65, 12}_2 ∧  b^{65, 12}_1 ∧  b^{65, 12}_0 ∧ true) 
c  in CNF:
c    -b^{65, 12}_2 ∨ -b^{65, 12}_1 ∨ -b^{65, 12}_0 ∨ false 
c  in DIMACS:
-17837 -17838 -17839  0

c i = 13
c  -2+1 --> -1
c    ( b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧  p_845) -> ( b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0)
c  in CNF:
c    -b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨  b^{65, 14}_2
c    -b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_1
c    -b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨  b^{65, 14}_0
c  in DIMACS:
-17840 -17841  17842 -845  17843 0
-17840 -17841  17842 -845 -17844 0
-17840 -17841  17842 -845  17845 0

c  -1+1 --> 0
c    ( b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0 ∧  p_845) -> (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧ -b^{65, 14}_0)
c  in CNF:
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_2
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_1
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_0
c  in DIMACS:
-17840  17841 -17842 -845 -17843 0
-17840  17841 -17842 -845 -17844 0
-17840  17841 -17842 -845 -17845 0

c  0+1 --> 1
c    (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧  p_845) -> (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0)
c  in CNF:
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_2
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_1
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨  b^{65, 14}_0
c  in DIMACS:
 17840  17841  17842 -845 -17843 0
 17840  17841  17842 -845 -17844 0
 17840  17841  17842 -845  17845 0

c  1+1 --> 2
c    (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0 ∧  p_845) -> (-b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0)
c  in CNF:
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_2
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨  b^{65, 14}_1
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ -p_845 ∨ -b^{65, 14}_0
c  in DIMACS:
 17840  17841 -17842 -845 -17843 0
 17840  17841 -17842 -845  17844 0
 17840  17841 -17842 -845 -17845 0

c  2+1 --> break 
c    (-b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧  p_845) -> break
c  in CNF:
c     b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ -p_845 ∨ break
c  in DIMACS:
 17840 -17841  17842 -845 1162 0


c  2-1 --> 1
c    (-b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧ -p_845) -> (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0)
c  in CNF:
c     b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_2
c     b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_1
c     b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨  b^{65, 14}_0
c  in DIMACS:
 17840 -17841  17842  845 -17843 0
 17840 -17841  17842  845 -17844 0
 17840 -17841  17842  845  17845 0

c  1-1 --> 0
c    (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0 ∧ -p_845) -> (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧ -b^{65, 14}_0)
c  in CNF:
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_2
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_1
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_0
c  in DIMACS:
 17840  17841 -17842  845 -17843 0
 17840  17841 -17842  845 -17844 0
 17840  17841 -17842  845 -17845 0

c  0-1 --> -1
c    (-b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧ -p_845) -> ( b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0)
c  in CNF:
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨  b^{65, 14}_2
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_1
c     b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨  b^{65, 14}_0
c  in DIMACS:
 17840  17841  17842  845  17843 0
 17840  17841  17842  845 -17844 0
 17840  17841  17842  845  17845 0

c  -1-1 --> -2
c    ( b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧  b^{65, 13}_0 ∧ -p_845) -> ( b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0)
c  in CNF:
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨  b^{65, 14}_2
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨  b^{65, 14}_1
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨  p_845 ∨ -b^{65, 14}_0
c  in DIMACS:
-17840  17841 -17842  845  17843 0
-17840  17841 -17842  845  17844 0
-17840  17841 -17842  845 -17845 0

c  -2-1 --> break 
c    ( b^{65, 13}_2 ∧  b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧ -p_845) -> break
c  in CNF:
c    -b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨  b^{65, 13}_0 ∨  p_845 ∨ break
c  in DIMACS:
-17840 -17841  17842  845 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 13}_2 ∧ -b^{65, 13}_1 ∧ -b^{65, 13}_0 ∧ true) 
c  in CNF:
c    -b^{65, 13}_2 ∨  b^{65, 13}_1 ∨  b^{65, 13}_0 ∨ false 
c  in DIMACS:
-17840  17841  17842  0

c  3 does not represent an automaton state.
c    -(-b^{65, 13}_2 ∧  b^{65, 13}_1 ∧  b^{65, 13}_0 ∧ true) 
c  in CNF:
c     b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ false 
c  in DIMACS:
 17840 -17841 -17842  0
c  -3 does not represent an automaton state.
c    -( b^{65, 13}_2 ∧  b^{65, 13}_1 ∧  b^{65, 13}_0 ∧ true) 
c  in CNF:
c    -b^{65, 13}_2 ∨ -b^{65, 13}_1 ∨ -b^{65, 13}_0 ∨ false 
c  in DIMACS:
-17840 -17841 -17842  0

c i = 14
c  -2+1 --> -1
c    ( b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧  p_910) -> ( b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0)
c  in CNF:
c    -b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨  b^{65, 15}_2
c    -b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_1
c    -b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨  b^{65, 15}_0
c  in DIMACS:
-17843 -17844  17845 -910  17846 0
-17843 -17844  17845 -910 -17847 0
-17843 -17844  17845 -910  17848 0

c  -1+1 --> 0
c    ( b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0 ∧  p_910) -> (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧ -b^{65, 15}_0)
c  in CNF:
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_2
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_1
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_0
c  in DIMACS:
-17843  17844 -17845 -910 -17846 0
-17843  17844 -17845 -910 -17847 0
-17843  17844 -17845 -910 -17848 0

c  0+1 --> 1
c    (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧  p_910) -> (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0)
c  in CNF:
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_2
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_1
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨  b^{65, 15}_0
c  in DIMACS:
 17843  17844  17845 -910 -17846 0
 17843  17844  17845 -910 -17847 0
 17843  17844  17845 -910  17848 0

c  1+1 --> 2
c    (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0 ∧  p_910) -> (-b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0)
c  in CNF:
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_2
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨  b^{65, 15}_1
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ -p_910 ∨ -b^{65, 15}_0
c  in DIMACS:
 17843  17844 -17845 -910 -17846 0
 17843  17844 -17845 -910  17847 0
 17843  17844 -17845 -910 -17848 0

c  2+1 --> break 
c    (-b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧  p_910) -> break
c  in CNF:
c     b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 17843 -17844  17845 -910 1162 0


c  2-1 --> 1
c    (-b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧ -p_910) -> (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0)
c  in CNF:
c     b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_2
c     b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_1
c     b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨  b^{65, 15}_0
c  in DIMACS:
 17843 -17844  17845  910 -17846 0
 17843 -17844  17845  910 -17847 0
 17843 -17844  17845  910  17848 0

c  1-1 --> 0
c    (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0 ∧ -p_910) -> (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧ -b^{65, 15}_0)
c  in CNF:
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_2
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_1
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_0
c  in DIMACS:
 17843  17844 -17845  910 -17846 0
 17843  17844 -17845  910 -17847 0
 17843  17844 -17845  910 -17848 0

c  0-1 --> -1
c    (-b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧ -p_910) -> ( b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0)
c  in CNF:
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨  b^{65, 15}_2
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_1
c     b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨  b^{65, 15}_0
c  in DIMACS:
 17843  17844  17845  910  17846 0
 17843  17844  17845  910 -17847 0
 17843  17844  17845  910  17848 0

c  -1-1 --> -2
c    ( b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧  b^{65, 14}_0 ∧ -p_910) -> ( b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0)
c  in CNF:
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨  b^{65, 15}_2
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨  b^{65, 15}_1
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨  p_910 ∨ -b^{65, 15}_0
c  in DIMACS:
-17843  17844 -17845  910  17846 0
-17843  17844 -17845  910  17847 0
-17843  17844 -17845  910 -17848 0

c  -2-1 --> break 
c    ( b^{65, 14}_2 ∧  b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨  b^{65, 14}_0 ∨  p_910 ∨ break
c  in DIMACS:
-17843 -17844  17845  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 14}_2 ∧ -b^{65, 14}_1 ∧ -b^{65, 14}_0 ∧ true) 
c  in CNF:
c    -b^{65, 14}_2 ∨  b^{65, 14}_1 ∨  b^{65, 14}_0 ∨ false 
c  in DIMACS:
-17843  17844  17845  0

c  3 does not represent an automaton state.
c    -(-b^{65, 14}_2 ∧  b^{65, 14}_1 ∧  b^{65, 14}_0 ∧ true) 
c  in CNF:
c     b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ false 
c  in DIMACS:
 17843 -17844 -17845  0
c  -3 does not represent an automaton state.
c    -( b^{65, 14}_2 ∧  b^{65, 14}_1 ∧  b^{65, 14}_0 ∧ true) 
c  in CNF:
c    -b^{65, 14}_2 ∨ -b^{65, 14}_1 ∨ -b^{65, 14}_0 ∨ false 
c  in DIMACS:
-17843 -17844 -17845  0

c i = 15
c  -2+1 --> -1
c    ( b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧  p_975) -> ( b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0)
c  in CNF:
c    -b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨  b^{65, 16}_2
c    -b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_1
c    -b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨  b^{65, 16}_0
c  in DIMACS:
-17846 -17847  17848 -975  17849 0
-17846 -17847  17848 -975 -17850 0
-17846 -17847  17848 -975  17851 0

c  -1+1 --> 0
c    ( b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0 ∧  p_975) -> (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧ -b^{65, 16}_0)
c  in CNF:
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_2
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_1
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_0
c  in DIMACS:
-17846  17847 -17848 -975 -17849 0
-17846  17847 -17848 -975 -17850 0
-17846  17847 -17848 -975 -17851 0

c  0+1 --> 1
c    (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧  p_975) -> (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0)
c  in CNF:
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_2
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_1
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨  b^{65, 16}_0
c  in DIMACS:
 17846  17847  17848 -975 -17849 0
 17846  17847  17848 -975 -17850 0
 17846  17847  17848 -975  17851 0

c  1+1 --> 2
c    (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0 ∧  p_975) -> (-b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0)
c  in CNF:
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_2
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨  b^{65, 16}_1
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ -p_975 ∨ -b^{65, 16}_0
c  in DIMACS:
 17846  17847 -17848 -975 -17849 0
 17846  17847 -17848 -975  17850 0
 17846  17847 -17848 -975 -17851 0

c  2+1 --> break 
c    (-b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧  p_975) -> break
c  in CNF:
c     b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 17846 -17847  17848 -975 1162 0


c  2-1 --> 1
c    (-b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧ -p_975) -> (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0)
c  in CNF:
c     b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_2
c     b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_1
c     b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨  b^{65, 16}_0
c  in DIMACS:
 17846 -17847  17848  975 -17849 0
 17846 -17847  17848  975 -17850 0
 17846 -17847  17848  975  17851 0

c  1-1 --> 0
c    (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0 ∧ -p_975) -> (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧ -b^{65, 16}_0)
c  in CNF:
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_2
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_1
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_0
c  in DIMACS:
 17846  17847 -17848  975 -17849 0
 17846  17847 -17848  975 -17850 0
 17846  17847 -17848  975 -17851 0

c  0-1 --> -1
c    (-b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧ -p_975) -> ( b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0)
c  in CNF:
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨  b^{65, 16}_2
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_1
c     b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨  b^{65, 16}_0
c  in DIMACS:
 17846  17847  17848  975  17849 0
 17846  17847  17848  975 -17850 0
 17846  17847  17848  975  17851 0

c  -1-1 --> -2
c    ( b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧  b^{65, 15}_0 ∧ -p_975) -> ( b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0)
c  in CNF:
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨  b^{65, 16}_2
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨  b^{65, 16}_1
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨  p_975 ∨ -b^{65, 16}_0
c  in DIMACS:
-17846  17847 -17848  975  17849 0
-17846  17847 -17848  975  17850 0
-17846  17847 -17848  975 -17851 0

c  -2-1 --> break 
c    ( b^{65, 15}_2 ∧  b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨  b^{65, 15}_0 ∨  p_975 ∨ break
c  in DIMACS:
-17846 -17847  17848  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 15}_2 ∧ -b^{65, 15}_1 ∧ -b^{65, 15}_0 ∧ true) 
c  in CNF:
c    -b^{65, 15}_2 ∨  b^{65, 15}_1 ∨  b^{65, 15}_0 ∨ false 
c  in DIMACS:
-17846  17847  17848  0

c  3 does not represent an automaton state.
c    -(-b^{65, 15}_2 ∧  b^{65, 15}_1 ∧  b^{65, 15}_0 ∧ true) 
c  in CNF:
c     b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ false 
c  in DIMACS:
 17846 -17847 -17848  0
c  -3 does not represent an automaton state.
c    -( b^{65, 15}_2 ∧  b^{65, 15}_1 ∧  b^{65, 15}_0 ∧ true) 
c  in CNF:
c    -b^{65, 15}_2 ∨ -b^{65, 15}_1 ∨ -b^{65, 15}_0 ∨ false 
c  in DIMACS:
-17846 -17847 -17848  0

c i = 16
c  -2+1 --> -1
c    ( b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧  p_1040) -> ( b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0)
c  in CNF:
c    -b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨  b^{65, 17}_2
c    -b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_1
c    -b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨  b^{65, 17}_0
c  in DIMACS:
-17849 -17850  17851 -1040  17852 0
-17849 -17850  17851 -1040 -17853 0
-17849 -17850  17851 -1040  17854 0

c  -1+1 --> 0
c    ( b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0 ∧  p_1040) -> (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧ -b^{65, 17}_0)
c  in CNF:
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_2
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_1
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_0
c  in DIMACS:
-17849  17850 -17851 -1040 -17852 0
-17849  17850 -17851 -1040 -17853 0
-17849  17850 -17851 -1040 -17854 0

c  0+1 --> 1
c    (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧  p_1040) -> (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0)
c  in CNF:
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_2
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_1
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨  b^{65, 17}_0
c  in DIMACS:
 17849  17850  17851 -1040 -17852 0
 17849  17850  17851 -1040 -17853 0
 17849  17850  17851 -1040  17854 0

c  1+1 --> 2
c    (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0 ∧  p_1040) -> (-b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0)
c  in CNF:
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_2
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨  b^{65, 17}_1
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ -p_1040 ∨ -b^{65, 17}_0
c  in DIMACS:
 17849  17850 -17851 -1040 -17852 0
 17849  17850 -17851 -1040  17853 0
 17849  17850 -17851 -1040 -17854 0

c  2+1 --> break 
c    (-b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 17849 -17850  17851 -1040 1162 0


c  2-1 --> 1
c    (-b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧ -p_1040) -> (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0)
c  in CNF:
c     b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_2
c     b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_1
c     b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨  b^{65, 17}_0
c  in DIMACS:
 17849 -17850  17851  1040 -17852 0
 17849 -17850  17851  1040 -17853 0
 17849 -17850  17851  1040  17854 0

c  1-1 --> 0
c    (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0 ∧ -p_1040) -> (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧ -b^{65, 17}_0)
c  in CNF:
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_2
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_1
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_0
c  in DIMACS:
 17849  17850 -17851  1040 -17852 0
 17849  17850 -17851  1040 -17853 0
 17849  17850 -17851  1040 -17854 0

c  0-1 --> -1
c    (-b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧ -p_1040) -> ( b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0)
c  in CNF:
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨  b^{65, 17}_2
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_1
c     b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨  b^{65, 17}_0
c  in DIMACS:
 17849  17850  17851  1040  17852 0
 17849  17850  17851  1040 -17853 0
 17849  17850  17851  1040  17854 0

c  -1-1 --> -2
c    ( b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧  b^{65, 16}_0 ∧ -p_1040) -> ( b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0)
c  in CNF:
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨  b^{65, 17}_2
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨  b^{65, 17}_1
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨  p_1040 ∨ -b^{65, 17}_0
c  in DIMACS:
-17849  17850 -17851  1040  17852 0
-17849  17850 -17851  1040  17853 0
-17849  17850 -17851  1040 -17854 0

c  -2-1 --> break 
c    ( b^{65, 16}_2 ∧  b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨  b^{65, 16}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-17849 -17850  17851  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 16}_2 ∧ -b^{65, 16}_1 ∧ -b^{65, 16}_0 ∧ true) 
c  in CNF:
c    -b^{65, 16}_2 ∨  b^{65, 16}_1 ∨  b^{65, 16}_0 ∨ false 
c  in DIMACS:
-17849  17850  17851  0

c  3 does not represent an automaton state.
c    -(-b^{65, 16}_2 ∧  b^{65, 16}_1 ∧  b^{65, 16}_0 ∧ true) 
c  in CNF:
c     b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ false 
c  in DIMACS:
 17849 -17850 -17851  0
c  -3 does not represent an automaton state.
c    -( b^{65, 16}_2 ∧  b^{65, 16}_1 ∧  b^{65, 16}_0 ∧ true) 
c  in CNF:
c    -b^{65, 16}_2 ∨ -b^{65, 16}_1 ∨ -b^{65, 16}_0 ∨ false 
c  in DIMACS:
-17849 -17850 -17851  0

c i = 17
c  -2+1 --> -1
c    ( b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧  p_1105) -> ( b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧  b^{65, 18}_0)
c  in CNF:
c    -b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨  b^{65, 18}_2
c    -b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_1
c    -b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨  b^{65, 18}_0
c  in DIMACS:
-17852 -17853  17854 -1105  17855 0
-17852 -17853  17854 -1105 -17856 0
-17852 -17853  17854 -1105  17857 0

c  -1+1 --> 0
c    ( b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0 ∧  p_1105) -> (-b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧ -b^{65, 18}_0)
c  in CNF:
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_2
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_1
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_0
c  in DIMACS:
-17852  17853 -17854 -1105 -17855 0
-17852  17853 -17854 -1105 -17856 0
-17852  17853 -17854 -1105 -17857 0

c  0+1 --> 1
c    (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧  p_1105) -> (-b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧  b^{65, 18}_0)
c  in CNF:
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_2
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_1
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨  b^{65, 18}_0
c  in DIMACS:
 17852  17853  17854 -1105 -17855 0
 17852  17853  17854 -1105 -17856 0
 17852  17853  17854 -1105  17857 0

c  1+1 --> 2
c    (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0 ∧  p_1105) -> (-b^{65, 18}_2 ∧  b^{65, 18}_1 ∧ -b^{65, 18}_0)
c  in CNF:
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_2
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨  b^{65, 18}_1
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ -p_1105 ∨ -b^{65, 18}_0
c  in DIMACS:
 17852  17853 -17854 -1105 -17855 0
 17852  17853 -17854 -1105  17856 0
 17852  17853 -17854 -1105 -17857 0

c  2+1 --> break 
c    (-b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 17852 -17853  17854 -1105 1162 0


c  2-1 --> 1
c    (-b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧ -p_1105) -> (-b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧  b^{65, 18}_0)
c  in CNF:
c     b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_2
c     b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_1
c     b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨  b^{65, 18}_0
c  in DIMACS:
 17852 -17853  17854  1105 -17855 0
 17852 -17853  17854  1105 -17856 0
 17852 -17853  17854  1105  17857 0

c  1-1 --> 0
c    (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0 ∧ -p_1105) -> (-b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧ -b^{65, 18}_0)
c  in CNF:
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_2
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_1
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_0
c  in DIMACS:
 17852  17853 -17854  1105 -17855 0
 17852  17853 -17854  1105 -17856 0
 17852  17853 -17854  1105 -17857 0

c  0-1 --> -1
c    (-b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧ -p_1105) -> ( b^{65, 18}_2 ∧ -b^{65, 18}_1 ∧  b^{65, 18}_0)
c  in CNF:
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨  b^{65, 18}_2
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_1
c     b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨  b^{65, 18}_0
c  in DIMACS:
 17852  17853  17854  1105  17855 0
 17852  17853  17854  1105 -17856 0
 17852  17853  17854  1105  17857 0

c  -1-1 --> -2
c    ( b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧  b^{65, 17}_0 ∧ -p_1105) -> ( b^{65, 18}_2 ∧  b^{65, 18}_1 ∧ -b^{65, 18}_0)
c  in CNF:
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨  b^{65, 18}_2
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨  b^{65, 18}_1
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨  p_1105 ∨ -b^{65, 18}_0
c  in DIMACS:
-17852  17853 -17854  1105  17855 0
-17852  17853 -17854  1105  17856 0
-17852  17853 -17854  1105 -17857 0

c  -2-1 --> break 
c    ( b^{65, 17}_2 ∧  b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨  b^{65, 17}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-17852 -17853  17854  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{65, 17}_2 ∧ -b^{65, 17}_1 ∧ -b^{65, 17}_0 ∧ true) 
c  in CNF:
c    -b^{65, 17}_2 ∨  b^{65, 17}_1 ∨  b^{65, 17}_0 ∨ false 
c  in DIMACS:
-17852  17853  17854  0

c  3 does not represent an automaton state.
c    -(-b^{65, 17}_2 ∧  b^{65, 17}_1 ∧  b^{65, 17}_0 ∧ true) 
c  in CNF:
c     b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ false 
c  in DIMACS:
 17852 -17853 -17854  0
c  -3 does not represent an automaton state.
c    -( b^{65, 17}_2 ∧  b^{65, 17}_1 ∧  b^{65, 17}_0 ∧ true) 
c  in CNF:
c    -b^{65, 17}_2 ∨ -b^{65, 17}_1 ∨ -b^{65, 17}_0 ∨ false 
c  in DIMACS:
-17852 -17853 -17854  0

c INIT for k = 66
c    -b^{66, 1}_2
c    -b^{66, 1}_1
c    -b^{66, 1}_0
c  in DIMACS:
-17858 0
-17859 0
-17860 0

c Transitions for k = 66
c i = 1
c  -2+1 --> -1
c    ( b^{66, 1}_2 ∧  b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧  p_66) -> ( b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0)
c  in CNF:
c    -b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨  b^{66, 2}_2
c    -b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_1
c    -b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨  b^{66, 2}_0
c  in DIMACS:
-17858 -17859  17860 -66  17861 0
-17858 -17859  17860 -66 -17862 0
-17858 -17859  17860 -66  17863 0

c  -1+1 --> 0
c    ( b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧  b^{66, 1}_0 ∧  p_66) -> (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧ -b^{66, 2}_0)
c  in CNF:
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_2
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_1
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_0
c  in DIMACS:
-17858  17859 -17860 -66 -17861 0
-17858  17859 -17860 -66 -17862 0
-17858  17859 -17860 -66 -17863 0

c  0+1 --> 1
c    (-b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧  p_66) -> (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0)
c  in CNF:
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_2
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_1
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨  b^{66, 2}_0
c  in DIMACS:
 17858  17859  17860 -66 -17861 0
 17858  17859  17860 -66 -17862 0
 17858  17859  17860 -66  17863 0

c  1+1 --> 2
c    (-b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧  b^{66, 1}_0 ∧  p_66) -> (-b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0)
c  in CNF:
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_2
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨  b^{66, 2}_1
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ -p_66 ∨ -b^{66, 2}_0
c  in DIMACS:
 17858  17859 -17860 -66 -17861 0
 17858  17859 -17860 -66  17862 0
 17858  17859 -17860 -66 -17863 0

c  2+1 --> break 
c    (-b^{66, 1}_2 ∧  b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧  p_66) -> break
c  in CNF:
c     b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ -p_66 ∨ break
c  in DIMACS:
 17858 -17859  17860 -66 1162 0


c  2-1 --> 1
c    (-b^{66, 1}_2 ∧  b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧ -p_66) -> (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0)
c  in CNF:
c     b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_2
c     b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_1
c     b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨  b^{66, 2}_0
c  in DIMACS:
 17858 -17859  17860  66 -17861 0
 17858 -17859  17860  66 -17862 0
 17858 -17859  17860  66  17863 0

c  1-1 --> 0
c    (-b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧  b^{66, 1}_0 ∧ -p_66) -> (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧ -b^{66, 2}_0)
c  in CNF:
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_2
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_1
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_0
c  in DIMACS:
 17858  17859 -17860  66 -17861 0
 17858  17859 -17860  66 -17862 0
 17858  17859 -17860  66 -17863 0

c  0-1 --> -1
c    (-b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧ -p_66) -> ( b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0)
c  in CNF:
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨  b^{66, 2}_2
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_1
c     b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨  b^{66, 2}_0
c  in DIMACS:
 17858  17859  17860  66  17861 0
 17858  17859  17860  66 -17862 0
 17858  17859  17860  66  17863 0

c  -1-1 --> -2
c    ( b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧  b^{66, 1}_0 ∧ -p_66) -> ( b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0)
c  in CNF:
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨  b^{66, 2}_2
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨  b^{66, 2}_1
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨  p_66 ∨ -b^{66, 2}_0
c  in DIMACS:
-17858  17859 -17860  66  17861 0
-17858  17859 -17860  66  17862 0
-17858  17859 -17860  66 -17863 0

c  -2-1 --> break 
c    ( b^{66, 1}_2 ∧  b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧ -p_66) -> break
c  in CNF:
c    -b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨  b^{66, 1}_0 ∨  p_66 ∨ break
c  in DIMACS:
-17858 -17859  17860  66 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 1}_2 ∧ -b^{66, 1}_1 ∧ -b^{66, 1}_0 ∧ true) 
c  in CNF:
c    -b^{66, 1}_2 ∨  b^{66, 1}_1 ∨  b^{66, 1}_0 ∨ false 
c  in DIMACS:
-17858  17859  17860  0

c  3 does not represent an automaton state.
c    -(-b^{66, 1}_2 ∧  b^{66, 1}_1 ∧  b^{66, 1}_0 ∧ true) 
c  in CNF:
c     b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ false 
c  in DIMACS:
 17858 -17859 -17860  0
c  -3 does not represent an automaton state.
c    -( b^{66, 1}_2 ∧  b^{66, 1}_1 ∧  b^{66, 1}_0 ∧ true) 
c  in CNF:
c    -b^{66, 1}_2 ∨ -b^{66, 1}_1 ∨ -b^{66, 1}_0 ∨ false 
c  in DIMACS:
-17858 -17859 -17860  0

c i = 2
c  -2+1 --> -1
c    ( b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧  p_132) -> ( b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0)
c  in CNF:
c    -b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨  b^{66, 3}_2
c    -b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_1
c    -b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨  b^{66, 3}_0
c  in DIMACS:
-17861 -17862  17863 -132  17864 0
-17861 -17862  17863 -132 -17865 0
-17861 -17862  17863 -132  17866 0

c  -1+1 --> 0
c    ( b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0 ∧  p_132) -> (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧ -b^{66, 3}_0)
c  in CNF:
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_2
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_1
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_0
c  in DIMACS:
-17861  17862 -17863 -132 -17864 0
-17861  17862 -17863 -132 -17865 0
-17861  17862 -17863 -132 -17866 0

c  0+1 --> 1
c    (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧  p_132) -> (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0)
c  in CNF:
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_2
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_1
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨  b^{66, 3}_0
c  in DIMACS:
 17861  17862  17863 -132 -17864 0
 17861  17862  17863 -132 -17865 0
 17861  17862  17863 -132  17866 0

c  1+1 --> 2
c    (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0 ∧  p_132) -> (-b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0)
c  in CNF:
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_2
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨  b^{66, 3}_1
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ -p_132 ∨ -b^{66, 3}_0
c  in DIMACS:
 17861  17862 -17863 -132 -17864 0
 17861  17862 -17863 -132  17865 0
 17861  17862 -17863 -132 -17866 0

c  2+1 --> break 
c    (-b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧  p_132) -> break
c  in CNF:
c     b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 17861 -17862  17863 -132 1162 0


c  2-1 --> 1
c    (-b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧ -p_132) -> (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0)
c  in CNF:
c     b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_2
c     b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_1
c     b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨  b^{66, 3}_0
c  in DIMACS:
 17861 -17862  17863  132 -17864 0
 17861 -17862  17863  132 -17865 0
 17861 -17862  17863  132  17866 0

c  1-1 --> 0
c    (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0 ∧ -p_132) -> (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧ -b^{66, 3}_0)
c  in CNF:
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_2
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_1
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_0
c  in DIMACS:
 17861  17862 -17863  132 -17864 0
 17861  17862 -17863  132 -17865 0
 17861  17862 -17863  132 -17866 0

c  0-1 --> -1
c    (-b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧ -p_132) -> ( b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0)
c  in CNF:
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨  b^{66, 3}_2
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_1
c     b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨  b^{66, 3}_0
c  in DIMACS:
 17861  17862  17863  132  17864 0
 17861  17862  17863  132 -17865 0
 17861  17862  17863  132  17866 0

c  -1-1 --> -2
c    ( b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧  b^{66, 2}_0 ∧ -p_132) -> ( b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0)
c  in CNF:
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨  b^{66, 3}_2
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨  b^{66, 3}_1
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨  p_132 ∨ -b^{66, 3}_0
c  in DIMACS:
-17861  17862 -17863  132  17864 0
-17861  17862 -17863  132  17865 0
-17861  17862 -17863  132 -17866 0

c  -2-1 --> break 
c    ( b^{66, 2}_2 ∧  b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨  b^{66, 2}_0 ∨  p_132 ∨ break
c  in DIMACS:
-17861 -17862  17863  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 2}_2 ∧ -b^{66, 2}_1 ∧ -b^{66, 2}_0 ∧ true) 
c  in CNF:
c    -b^{66, 2}_2 ∨  b^{66, 2}_1 ∨  b^{66, 2}_0 ∨ false 
c  in DIMACS:
-17861  17862  17863  0

c  3 does not represent an automaton state.
c    -(-b^{66, 2}_2 ∧  b^{66, 2}_1 ∧  b^{66, 2}_0 ∧ true) 
c  in CNF:
c     b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ false 
c  in DIMACS:
 17861 -17862 -17863  0
c  -3 does not represent an automaton state.
c    -( b^{66, 2}_2 ∧  b^{66, 2}_1 ∧  b^{66, 2}_0 ∧ true) 
c  in CNF:
c    -b^{66, 2}_2 ∨ -b^{66, 2}_1 ∨ -b^{66, 2}_0 ∨ false 
c  in DIMACS:
-17861 -17862 -17863  0

c i = 3
c  -2+1 --> -1
c    ( b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧  p_198) -> ( b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0)
c  in CNF:
c    -b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨  b^{66, 4}_2
c    -b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_1
c    -b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨  b^{66, 4}_0
c  in DIMACS:
-17864 -17865  17866 -198  17867 0
-17864 -17865  17866 -198 -17868 0
-17864 -17865  17866 -198  17869 0

c  -1+1 --> 0
c    ( b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0 ∧  p_198) -> (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧ -b^{66, 4}_0)
c  in CNF:
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_2
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_1
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_0
c  in DIMACS:
-17864  17865 -17866 -198 -17867 0
-17864  17865 -17866 -198 -17868 0
-17864  17865 -17866 -198 -17869 0

c  0+1 --> 1
c    (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧  p_198) -> (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0)
c  in CNF:
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_2
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_1
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨  b^{66, 4}_0
c  in DIMACS:
 17864  17865  17866 -198 -17867 0
 17864  17865  17866 -198 -17868 0
 17864  17865  17866 -198  17869 0

c  1+1 --> 2
c    (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0 ∧  p_198) -> (-b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0)
c  in CNF:
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_2
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨  b^{66, 4}_1
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ -p_198 ∨ -b^{66, 4}_0
c  in DIMACS:
 17864  17865 -17866 -198 -17867 0
 17864  17865 -17866 -198  17868 0
 17864  17865 -17866 -198 -17869 0

c  2+1 --> break 
c    (-b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧  p_198) -> break
c  in CNF:
c     b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 17864 -17865  17866 -198 1162 0


c  2-1 --> 1
c    (-b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧ -p_198) -> (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0)
c  in CNF:
c     b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_2
c     b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_1
c     b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨  b^{66, 4}_0
c  in DIMACS:
 17864 -17865  17866  198 -17867 0
 17864 -17865  17866  198 -17868 0
 17864 -17865  17866  198  17869 0

c  1-1 --> 0
c    (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0 ∧ -p_198) -> (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧ -b^{66, 4}_0)
c  in CNF:
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_2
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_1
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_0
c  in DIMACS:
 17864  17865 -17866  198 -17867 0
 17864  17865 -17866  198 -17868 0
 17864  17865 -17866  198 -17869 0

c  0-1 --> -1
c    (-b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧ -p_198) -> ( b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0)
c  in CNF:
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨  b^{66, 4}_2
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_1
c     b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨  b^{66, 4}_0
c  in DIMACS:
 17864  17865  17866  198  17867 0
 17864  17865  17866  198 -17868 0
 17864  17865  17866  198  17869 0

c  -1-1 --> -2
c    ( b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧  b^{66, 3}_0 ∧ -p_198) -> ( b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0)
c  in CNF:
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨  b^{66, 4}_2
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨  b^{66, 4}_1
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨  p_198 ∨ -b^{66, 4}_0
c  in DIMACS:
-17864  17865 -17866  198  17867 0
-17864  17865 -17866  198  17868 0
-17864  17865 -17866  198 -17869 0

c  -2-1 --> break 
c    ( b^{66, 3}_2 ∧  b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨  b^{66, 3}_0 ∨  p_198 ∨ break
c  in DIMACS:
-17864 -17865  17866  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 3}_2 ∧ -b^{66, 3}_1 ∧ -b^{66, 3}_0 ∧ true) 
c  in CNF:
c    -b^{66, 3}_2 ∨  b^{66, 3}_1 ∨  b^{66, 3}_0 ∨ false 
c  in DIMACS:
-17864  17865  17866  0

c  3 does not represent an automaton state.
c    -(-b^{66, 3}_2 ∧  b^{66, 3}_1 ∧  b^{66, 3}_0 ∧ true) 
c  in CNF:
c     b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ false 
c  in DIMACS:
 17864 -17865 -17866  0
c  -3 does not represent an automaton state.
c    -( b^{66, 3}_2 ∧  b^{66, 3}_1 ∧  b^{66, 3}_0 ∧ true) 
c  in CNF:
c    -b^{66, 3}_2 ∨ -b^{66, 3}_1 ∨ -b^{66, 3}_0 ∨ false 
c  in DIMACS:
-17864 -17865 -17866  0

c i = 4
c  -2+1 --> -1
c    ( b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧  p_264) -> ( b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0)
c  in CNF:
c    -b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨  b^{66, 5}_2
c    -b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_1
c    -b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨  b^{66, 5}_0
c  in DIMACS:
-17867 -17868  17869 -264  17870 0
-17867 -17868  17869 -264 -17871 0
-17867 -17868  17869 -264  17872 0

c  -1+1 --> 0
c    ( b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0 ∧  p_264) -> (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧ -b^{66, 5}_0)
c  in CNF:
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_2
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_1
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_0
c  in DIMACS:
-17867  17868 -17869 -264 -17870 0
-17867  17868 -17869 -264 -17871 0
-17867  17868 -17869 -264 -17872 0

c  0+1 --> 1
c    (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧  p_264) -> (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0)
c  in CNF:
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_2
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_1
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨  b^{66, 5}_0
c  in DIMACS:
 17867  17868  17869 -264 -17870 0
 17867  17868  17869 -264 -17871 0
 17867  17868  17869 -264  17872 0

c  1+1 --> 2
c    (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0 ∧  p_264) -> (-b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0)
c  in CNF:
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_2
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨  b^{66, 5}_1
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ -p_264 ∨ -b^{66, 5}_0
c  in DIMACS:
 17867  17868 -17869 -264 -17870 0
 17867  17868 -17869 -264  17871 0
 17867  17868 -17869 -264 -17872 0

c  2+1 --> break 
c    (-b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧  p_264) -> break
c  in CNF:
c     b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 17867 -17868  17869 -264 1162 0


c  2-1 --> 1
c    (-b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧ -p_264) -> (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0)
c  in CNF:
c     b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_2
c     b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_1
c     b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨  b^{66, 5}_0
c  in DIMACS:
 17867 -17868  17869  264 -17870 0
 17867 -17868  17869  264 -17871 0
 17867 -17868  17869  264  17872 0

c  1-1 --> 0
c    (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0 ∧ -p_264) -> (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧ -b^{66, 5}_0)
c  in CNF:
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_2
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_1
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_0
c  in DIMACS:
 17867  17868 -17869  264 -17870 0
 17867  17868 -17869  264 -17871 0
 17867  17868 -17869  264 -17872 0

c  0-1 --> -1
c    (-b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧ -p_264) -> ( b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0)
c  in CNF:
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨  b^{66, 5}_2
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_1
c     b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨  b^{66, 5}_0
c  in DIMACS:
 17867  17868  17869  264  17870 0
 17867  17868  17869  264 -17871 0
 17867  17868  17869  264  17872 0

c  -1-1 --> -2
c    ( b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧  b^{66, 4}_0 ∧ -p_264) -> ( b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0)
c  in CNF:
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨  b^{66, 5}_2
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨  b^{66, 5}_1
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨  p_264 ∨ -b^{66, 5}_0
c  in DIMACS:
-17867  17868 -17869  264  17870 0
-17867  17868 -17869  264  17871 0
-17867  17868 -17869  264 -17872 0

c  -2-1 --> break 
c    ( b^{66, 4}_2 ∧  b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨  b^{66, 4}_0 ∨  p_264 ∨ break
c  in DIMACS:
-17867 -17868  17869  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 4}_2 ∧ -b^{66, 4}_1 ∧ -b^{66, 4}_0 ∧ true) 
c  in CNF:
c    -b^{66, 4}_2 ∨  b^{66, 4}_1 ∨  b^{66, 4}_0 ∨ false 
c  in DIMACS:
-17867  17868  17869  0

c  3 does not represent an automaton state.
c    -(-b^{66, 4}_2 ∧  b^{66, 4}_1 ∧  b^{66, 4}_0 ∧ true) 
c  in CNF:
c     b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ false 
c  in DIMACS:
 17867 -17868 -17869  0
c  -3 does not represent an automaton state.
c    -( b^{66, 4}_2 ∧  b^{66, 4}_1 ∧  b^{66, 4}_0 ∧ true) 
c  in CNF:
c    -b^{66, 4}_2 ∨ -b^{66, 4}_1 ∨ -b^{66, 4}_0 ∨ false 
c  in DIMACS:
-17867 -17868 -17869  0

c i = 5
c  -2+1 --> -1
c    ( b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧  p_330) -> ( b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0)
c  in CNF:
c    -b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨  b^{66, 6}_2
c    -b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_1
c    -b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨  b^{66, 6}_0
c  in DIMACS:
-17870 -17871  17872 -330  17873 0
-17870 -17871  17872 -330 -17874 0
-17870 -17871  17872 -330  17875 0

c  -1+1 --> 0
c    ( b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0 ∧  p_330) -> (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧ -b^{66, 6}_0)
c  in CNF:
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_2
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_1
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_0
c  in DIMACS:
-17870  17871 -17872 -330 -17873 0
-17870  17871 -17872 -330 -17874 0
-17870  17871 -17872 -330 -17875 0

c  0+1 --> 1
c    (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧  p_330) -> (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0)
c  in CNF:
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_2
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_1
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨  b^{66, 6}_0
c  in DIMACS:
 17870  17871  17872 -330 -17873 0
 17870  17871  17872 -330 -17874 0
 17870  17871  17872 -330  17875 0

c  1+1 --> 2
c    (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0 ∧  p_330) -> (-b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0)
c  in CNF:
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_2
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨  b^{66, 6}_1
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ -p_330 ∨ -b^{66, 6}_0
c  in DIMACS:
 17870  17871 -17872 -330 -17873 0
 17870  17871 -17872 -330  17874 0
 17870  17871 -17872 -330 -17875 0

c  2+1 --> break 
c    (-b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧  p_330) -> break
c  in CNF:
c     b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 17870 -17871  17872 -330 1162 0


c  2-1 --> 1
c    (-b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧ -p_330) -> (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0)
c  in CNF:
c     b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_2
c     b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_1
c     b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨  b^{66, 6}_0
c  in DIMACS:
 17870 -17871  17872  330 -17873 0
 17870 -17871  17872  330 -17874 0
 17870 -17871  17872  330  17875 0

c  1-1 --> 0
c    (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0 ∧ -p_330) -> (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧ -b^{66, 6}_0)
c  in CNF:
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_2
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_1
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_0
c  in DIMACS:
 17870  17871 -17872  330 -17873 0
 17870  17871 -17872  330 -17874 0
 17870  17871 -17872  330 -17875 0

c  0-1 --> -1
c    (-b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧ -p_330) -> ( b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0)
c  in CNF:
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨  b^{66, 6}_2
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_1
c     b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨  b^{66, 6}_0
c  in DIMACS:
 17870  17871  17872  330  17873 0
 17870  17871  17872  330 -17874 0
 17870  17871  17872  330  17875 0

c  -1-1 --> -2
c    ( b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧  b^{66, 5}_0 ∧ -p_330) -> ( b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0)
c  in CNF:
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨  b^{66, 6}_2
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨  b^{66, 6}_1
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨  p_330 ∨ -b^{66, 6}_0
c  in DIMACS:
-17870  17871 -17872  330  17873 0
-17870  17871 -17872  330  17874 0
-17870  17871 -17872  330 -17875 0

c  -2-1 --> break 
c    ( b^{66, 5}_2 ∧  b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨  b^{66, 5}_0 ∨  p_330 ∨ break
c  in DIMACS:
-17870 -17871  17872  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 5}_2 ∧ -b^{66, 5}_1 ∧ -b^{66, 5}_0 ∧ true) 
c  in CNF:
c    -b^{66, 5}_2 ∨  b^{66, 5}_1 ∨  b^{66, 5}_0 ∨ false 
c  in DIMACS:
-17870  17871  17872  0

c  3 does not represent an automaton state.
c    -(-b^{66, 5}_2 ∧  b^{66, 5}_1 ∧  b^{66, 5}_0 ∧ true) 
c  in CNF:
c     b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ false 
c  in DIMACS:
 17870 -17871 -17872  0
c  -3 does not represent an automaton state.
c    -( b^{66, 5}_2 ∧  b^{66, 5}_1 ∧  b^{66, 5}_0 ∧ true) 
c  in CNF:
c    -b^{66, 5}_2 ∨ -b^{66, 5}_1 ∨ -b^{66, 5}_0 ∨ false 
c  in DIMACS:
-17870 -17871 -17872  0

c i = 6
c  -2+1 --> -1
c    ( b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧  p_396) -> ( b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0)
c  in CNF:
c    -b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨  b^{66, 7}_2
c    -b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_1
c    -b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨  b^{66, 7}_0
c  in DIMACS:
-17873 -17874  17875 -396  17876 0
-17873 -17874  17875 -396 -17877 0
-17873 -17874  17875 -396  17878 0

c  -1+1 --> 0
c    ( b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0 ∧  p_396) -> (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧ -b^{66, 7}_0)
c  in CNF:
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_2
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_1
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_0
c  in DIMACS:
-17873  17874 -17875 -396 -17876 0
-17873  17874 -17875 -396 -17877 0
-17873  17874 -17875 -396 -17878 0

c  0+1 --> 1
c    (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧  p_396) -> (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0)
c  in CNF:
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_2
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_1
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨  b^{66, 7}_0
c  in DIMACS:
 17873  17874  17875 -396 -17876 0
 17873  17874  17875 -396 -17877 0
 17873  17874  17875 -396  17878 0

c  1+1 --> 2
c    (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0 ∧  p_396) -> (-b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0)
c  in CNF:
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_2
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨  b^{66, 7}_1
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ -p_396 ∨ -b^{66, 7}_0
c  in DIMACS:
 17873  17874 -17875 -396 -17876 0
 17873  17874 -17875 -396  17877 0
 17873  17874 -17875 -396 -17878 0

c  2+1 --> break 
c    (-b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧  p_396) -> break
c  in CNF:
c     b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 17873 -17874  17875 -396 1162 0


c  2-1 --> 1
c    (-b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧ -p_396) -> (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0)
c  in CNF:
c     b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_2
c     b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_1
c     b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨  b^{66, 7}_0
c  in DIMACS:
 17873 -17874  17875  396 -17876 0
 17873 -17874  17875  396 -17877 0
 17873 -17874  17875  396  17878 0

c  1-1 --> 0
c    (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0 ∧ -p_396) -> (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧ -b^{66, 7}_0)
c  in CNF:
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_2
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_1
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_0
c  in DIMACS:
 17873  17874 -17875  396 -17876 0
 17873  17874 -17875  396 -17877 0
 17873  17874 -17875  396 -17878 0

c  0-1 --> -1
c    (-b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧ -p_396) -> ( b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0)
c  in CNF:
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨  b^{66, 7}_2
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_1
c     b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨  b^{66, 7}_0
c  in DIMACS:
 17873  17874  17875  396  17876 0
 17873  17874  17875  396 -17877 0
 17873  17874  17875  396  17878 0

c  -1-1 --> -2
c    ( b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧  b^{66, 6}_0 ∧ -p_396) -> ( b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0)
c  in CNF:
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨  b^{66, 7}_2
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨  b^{66, 7}_1
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨  p_396 ∨ -b^{66, 7}_0
c  in DIMACS:
-17873  17874 -17875  396  17876 0
-17873  17874 -17875  396  17877 0
-17873  17874 -17875  396 -17878 0

c  -2-1 --> break 
c    ( b^{66, 6}_2 ∧  b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨  b^{66, 6}_0 ∨  p_396 ∨ break
c  in DIMACS:
-17873 -17874  17875  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 6}_2 ∧ -b^{66, 6}_1 ∧ -b^{66, 6}_0 ∧ true) 
c  in CNF:
c    -b^{66, 6}_2 ∨  b^{66, 6}_1 ∨  b^{66, 6}_0 ∨ false 
c  in DIMACS:
-17873  17874  17875  0

c  3 does not represent an automaton state.
c    -(-b^{66, 6}_2 ∧  b^{66, 6}_1 ∧  b^{66, 6}_0 ∧ true) 
c  in CNF:
c     b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ false 
c  in DIMACS:
 17873 -17874 -17875  0
c  -3 does not represent an automaton state.
c    -( b^{66, 6}_2 ∧  b^{66, 6}_1 ∧  b^{66, 6}_0 ∧ true) 
c  in CNF:
c    -b^{66, 6}_2 ∨ -b^{66, 6}_1 ∨ -b^{66, 6}_0 ∨ false 
c  in DIMACS:
-17873 -17874 -17875  0

c i = 7
c  -2+1 --> -1
c    ( b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧  p_462) -> ( b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0)
c  in CNF:
c    -b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨  b^{66, 8}_2
c    -b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_1
c    -b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨  b^{66, 8}_0
c  in DIMACS:
-17876 -17877  17878 -462  17879 0
-17876 -17877  17878 -462 -17880 0
-17876 -17877  17878 -462  17881 0

c  -1+1 --> 0
c    ( b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0 ∧  p_462) -> (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧ -b^{66, 8}_0)
c  in CNF:
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_2
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_1
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_0
c  in DIMACS:
-17876  17877 -17878 -462 -17879 0
-17876  17877 -17878 -462 -17880 0
-17876  17877 -17878 -462 -17881 0

c  0+1 --> 1
c    (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧  p_462) -> (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0)
c  in CNF:
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_2
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_1
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨  b^{66, 8}_0
c  in DIMACS:
 17876  17877  17878 -462 -17879 0
 17876  17877  17878 -462 -17880 0
 17876  17877  17878 -462  17881 0

c  1+1 --> 2
c    (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0 ∧  p_462) -> (-b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0)
c  in CNF:
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_2
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨  b^{66, 8}_1
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ -p_462 ∨ -b^{66, 8}_0
c  in DIMACS:
 17876  17877 -17878 -462 -17879 0
 17876  17877 -17878 -462  17880 0
 17876  17877 -17878 -462 -17881 0

c  2+1 --> break 
c    (-b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧  p_462) -> break
c  in CNF:
c     b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 17876 -17877  17878 -462 1162 0


c  2-1 --> 1
c    (-b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧ -p_462) -> (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0)
c  in CNF:
c     b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_2
c     b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_1
c     b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨  b^{66, 8}_0
c  in DIMACS:
 17876 -17877  17878  462 -17879 0
 17876 -17877  17878  462 -17880 0
 17876 -17877  17878  462  17881 0

c  1-1 --> 0
c    (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0 ∧ -p_462) -> (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧ -b^{66, 8}_0)
c  in CNF:
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_2
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_1
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_0
c  in DIMACS:
 17876  17877 -17878  462 -17879 0
 17876  17877 -17878  462 -17880 0
 17876  17877 -17878  462 -17881 0

c  0-1 --> -1
c    (-b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧ -p_462) -> ( b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0)
c  in CNF:
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨  b^{66, 8}_2
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_1
c     b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨  b^{66, 8}_0
c  in DIMACS:
 17876  17877  17878  462  17879 0
 17876  17877  17878  462 -17880 0
 17876  17877  17878  462  17881 0

c  -1-1 --> -2
c    ( b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧  b^{66, 7}_0 ∧ -p_462) -> ( b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0)
c  in CNF:
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨  b^{66, 8}_2
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨  b^{66, 8}_1
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨  p_462 ∨ -b^{66, 8}_0
c  in DIMACS:
-17876  17877 -17878  462  17879 0
-17876  17877 -17878  462  17880 0
-17876  17877 -17878  462 -17881 0

c  -2-1 --> break 
c    ( b^{66, 7}_2 ∧  b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨  b^{66, 7}_0 ∨  p_462 ∨ break
c  in DIMACS:
-17876 -17877  17878  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 7}_2 ∧ -b^{66, 7}_1 ∧ -b^{66, 7}_0 ∧ true) 
c  in CNF:
c    -b^{66, 7}_2 ∨  b^{66, 7}_1 ∨  b^{66, 7}_0 ∨ false 
c  in DIMACS:
-17876  17877  17878  0

c  3 does not represent an automaton state.
c    -(-b^{66, 7}_2 ∧  b^{66, 7}_1 ∧  b^{66, 7}_0 ∧ true) 
c  in CNF:
c     b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ false 
c  in DIMACS:
 17876 -17877 -17878  0
c  -3 does not represent an automaton state.
c    -( b^{66, 7}_2 ∧  b^{66, 7}_1 ∧  b^{66, 7}_0 ∧ true) 
c  in CNF:
c    -b^{66, 7}_2 ∨ -b^{66, 7}_1 ∨ -b^{66, 7}_0 ∨ false 
c  in DIMACS:
-17876 -17877 -17878  0

c i = 8
c  -2+1 --> -1
c    ( b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧  p_528) -> ( b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0)
c  in CNF:
c    -b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨  b^{66, 9}_2
c    -b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_1
c    -b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨  b^{66, 9}_0
c  in DIMACS:
-17879 -17880  17881 -528  17882 0
-17879 -17880  17881 -528 -17883 0
-17879 -17880  17881 -528  17884 0

c  -1+1 --> 0
c    ( b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0 ∧  p_528) -> (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧ -b^{66, 9}_0)
c  in CNF:
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_2
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_1
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_0
c  in DIMACS:
-17879  17880 -17881 -528 -17882 0
-17879  17880 -17881 -528 -17883 0
-17879  17880 -17881 -528 -17884 0

c  0+1 --> 1
c    (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧  p_528) -> (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0)
c  in CNF:
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_2
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_1
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨  b^{66, 9}_0
c  in DIMACS:
 17879  17880  17881 -528 -17882 0
 17879  17880  17881 -528 -17883 0
 17879  17880  17881 -528  17884 0

c  1+1 --> 2
c    (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0 ∧  p_528) -> (-b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0)
c  in CNF:
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_2
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨  b^{66, 9}_1
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ -p_528 ∨ -b^{66, 9}_0
c  in DIMACS:
 17879  17880 -17881 -528 -17882 0
 17879  17880 -17881 -528  17883 0
 17879  17880 -17881 -528 -17884 0

c  2+1 --> break 
c    (-b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧  p_528) -> break
c  in CNF:
c     b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 17879 -17880  17881 -528 1162 0


c  2-1 --> 1
c    (-b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧ -p_528) -> (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0)
c  in CNF:
c     b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_2
c     b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_1
c     b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨  b^{66, 9}_0
c  in DIMACS:
 17879 -17880  17881  528 -17882 0
 17879 -17880  17881  528 -17883 0
 17879 -17880  17881  528  17884 0

c  1-1 --> 0
c    (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0 ∧ -p_528) -> (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧ -b^{66, 9}_0)
c  in CNF:
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_2
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_1
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_0
c  in DIMACS:
 17879  17880 -17881  528 -17882 0
 17879  17880 -17881  528 -17883 0
 17879  17880 -17881  528 -17884 0

c  0-1 --> -1
c    (-b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧ -p_528) -> ( b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0)
c  in CNF:
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨  b^{66, 9}_2
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_1
c     b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨  b^{66, 9}_0
c  in DIMACS:
 17879  17880  17881  528  17882 0
 17879  17880  17881  528 -17883 0
 17879  17880  17881  528  17884 0

c  -1-1 --> -2
c    ( b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧  b^{66, 8}_0 ∧ -p_528) -> ( b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0)
c  in CNF:
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨  b^{66, 9}_2
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨  b^{66, 9}_1
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨  p_528 ∨ -b^{66, 9}_0
c  in DIMACS:
-17879  17880 -17881  528  17882 0
-17879  17880 -17881  528  17883 0
-17879  17880 -17881  528 -17884 0

c  -2-1 --> break 
c    ( b^{66, 8}_2 ∧  b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨  b^{66, 8}_0 ∨  p_528 ∨ break
c  in DIMACS:
-17879 -17880  17881  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 8}_2 ∧ -b^{66, 8}_1 ∧ -b^{66, 8}_0 ∧ true) 
c  in CNF:
c    -b^{66, 8}_2 ∨  b^{66, 8}_1 ∨  b^{66, 8}_0 ∨ false 
c  in DIMACS:
-17879  17880  17881  0

c  3 does not represent an automaton state.
c    -(-b^{66, 8}_2 ∧  b^{66, 8}_1 ∧  b^{66, 8}_0 ∧ true) 
c  in CNF:
c     b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ false 
c  in DIMACS:
 17879 -17880 -17881  0
c  -3 does not represent an automaton state.
c    -( b^{66, 8}_2 ∧  b^{66, 8}_1 ∧  b^{66, 8}_0 ∧ true) 
c  in CNF:
c    -b^{66, 8}_2 ∨ -b^{66, 8}_1 ∨ -b^{66, 8}_0 ∨ false 
c  in DIMACS:
-17879 -17880 -17881  0

c i = 9
c  -2+1 --> -1
c    ( b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧  p_594) -> ( b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0)
c  in CNF:
c    -b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨  b^{66, 10}_2
c    -b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_1
c    -b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨  b^{66, 10}_0
c  in DIMACS:
-17882 -17883  17884 -594  17885 0
-17882 -17883  17884 -594 -17886 0
-17882 -17883  17884 -594  17887 0

c  -1+1 --> 0
c    ( b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0 ∧  p_594) -> (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧ -b^{66, 10}_0)
c  in CNF:
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_2
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_1
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_0
c  in DIMACS:
-17882  17883 -17884 -594 -17885 0
-17882  17883 -17884 -594 -17886 0
-17882  17883 -17884 -594 -17887 0

c  0+1 --> 1
c    (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧  p_594) -> (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0)
c  in CNF:
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_2
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_1
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨  b^{66, 10}_0
c  in DIMACS:
 17882  17883  17884 -594 -17885 0
 17882  17883  17884 -594 -17886 0
 17882  17883  17884 -594  17887 0

c  1+1 --> 2
c    (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0 ∧  p_594) -> (-b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0)
c  in CNF:
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_2
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨  b^{66, 10}_1
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ -p_594 ∨ -b^{66, 10}_0
c  in DIMACS:
 17882  17883 -17884 -594 -17885 0
 17882  17883 -17884 -594  17886 0
 17882  17883 -17884 -594 -17887 0

c  2+1 --> break 
c    (-b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧  p_594) -> break
c  in CNF:
c     b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 17882 -17883  17884 -594 1162 0


c  2-1 --> 1
c    (-b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧ -p_594) -> (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0)
c  in CNF:
c     b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_2
c     b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_1
c     b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨  b^{66, 10}_0
c  in DIMACS:
 17882 -17883  17884  594 -17885 0
 17882 -17883  17884  594 -17886 0
 17882 -17883  17884  594  17887 0

c  1-1 --> 0
c    (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0 ∧ -p_594) -> (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧ -b^{66, 10}_0)
c  in CNF:
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_2
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_1
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_0
c  in DIMACS:
 17882  17883 -17884  594 -17885 0
 17882  17883 -17884  594 -17886 0
 17882  17883 -17884  594 -17887 0

c  0-1 --> -1
c    (-b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧ -p_594) -> ( b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0)
c  in CNF:
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨  b^{66, 10}_2
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_1
c     b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨  b^{66, 10}_0
c  in DIMACS:
 17882  17883  17884  594  17885 0
 17882  17883  17884  594 -17886 0
 17882  17883  17884  594  17887 0

c  -1-1 --> -2
c    ( b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧  b^{66, 9}_0 ∧ -p_594) -> ( b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0)
c  in CNF:
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨  b^{66, 10}_2
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨  b^{66, 10}_1
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨  p_594 ∨ -b^{66, 10}_0
c  in DIMACS:
-17882  17883 -17884  594  17885 0
-17882  17883 -17884  594  17886 0
-17882  17883 -17884  594 -17887 0

c  -2-1 --> break 
c    ( b^{66, 9}_2 ∧  b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨  b^{66, 9}_0 ∨  p_594 ∨ break
c  in DIMACS:
-17882 -17883  17884  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 9}_2 ∧ -b^{66, 9}_1 ∧ -b^{66, 9}_0 ∧ true) 
c  in CNF:
c    -b^{66, 9}_2 ∨  b^{66, 9}_1 ∨  b^{66, 9}_0 ∨ false 
c  in DIMACS:
-17882  17883  17884  0

c  3 does not represent an automaton state.
c    -(-b^{66, 9}_2 ∧  b^{66, 9}_1 ∧  b^{66, 9}_0 ∧ true) 
c  in CNF:
c     b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ false 
c  in DIMACS:
 17882 -17883 -17884  0
c  -3 does not represent an automaton state.
c    -( b^{66, 9}_2 ∧  b^{66, 9}_1 ∧  b^{66, 9}_0 ∧ true) 
c  in CNF:
c    -b^{66, 9}_2 ∨ -b^{66, 9}_1 ∨ -b^{66, 9}_0 ∨ false 
c  in DIMACS:
-17882 -17883 -17884  0

c i = 10
c  -2+1 --> -1
c    ( b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧  p_660) -> ( b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0)
c  in CNF:
c    -b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨  b^{66, 11}_2
c    -b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_1
c    -b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨  b^{66, 11}_0
c  in DIMACS:
-17885 -17886  17887 -660  17888 0
-17885 -17886  17887 -660 -17889 0
-17885 -17886  17887 -660  17890 0

c  -1+1 --> 0
c    ( b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0 ∧  p_660) -> (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧ -b^{66, 11}_0)
c  in CNF:
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_2
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_1
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_0
c  in DIMACS:
-17885  17886 -17887 -660 -17888 0
-17885  17886 -17887 -660 -17889 0
-17885  17886 -17887 -660 -17890 0

c  0+1 --> 1
c    (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧  p_660) -> (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0)
c  in CNF:
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_2
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_1
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨  b^{66, 11}_0
c  in DIMACS:
 17885  17886  17887 -660 -17888 0
 17885  17886  17887 -660 -17889 0
 17885  17886  17887 -660  17890 0

c  1+1 --> 2
c    (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0 ∧  p_660) -> (-b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0)
c  in CNF:
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_2
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨  b^{66, 11}_1
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ -p_660 ∨ -b^{66, 11}_0
c  in DIMACS:
 17885  17886 -17887 -660 -17888 0
 17885  17886 -17887 -660  17889 0
 17885  17886 -17887 -660 -17890 0

c  2+1 --> break 
c    (-b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧  p_660) -> break
c  in CNF:
c     b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 17885 -17886  17887 -660 1162 0


c  2-1 --> 1
c    (-b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧ -p_660) -> (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0)
c  in CNF:
c     b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_2
c     b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_1
c     b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨  b^{66, 11}_0
c  in DIMACS:
 17885 -17886  17887  660 -17888 0
 17885 -17886  17887  660 -17889 0
 17885 -17886  17887  660  17890 0

c  1-1 --> 0
c    (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0 ∧ -p_660) -> (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧ -b^{66, 11}_0)
c  in CNF:
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_2
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_1
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_0
c  in DIMACS:
 17885  17886 -17887  660 -17888 0
 17885  17886 -17887  660 -17889 0
 17885  17886 -17887  660 -17890 0

c  0-1 --> -1
c    (-b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧ -p_660) -> ( b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0)
c  in CNF:
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨  b^{66, 11}_2
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_1
c     b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨  b^{66, 11}_0
c  in DIMACS:
 17885  17886  17887  660  17888 0
 17885  17886  17887  660 -17889 0
 17885  17886  17887  660  17890 0

c  -1-1 --> -2
c    ( b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧  b^{66, 10}_0 ∧ -p_660) -> ( b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0)
c  in CNF:
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨  b^{66, 11}_2
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨  b^{66, 11}_1
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨  p_660 ∨ -b^{66, 11}_0
c  in DIMACS:
-17885  17886 -17887  660  17888 0
-17885  17886 -17887  660  17889 0
-17885  17886 -17887  660 -17890 0

c  -2-1 --> break 
c    ( b^{66, 10}_2 ∧  b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨  b^{66, 10}_0 ∨  p_660 ∨ break
c  in DIMACS:
-17885 -17886  17887  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 10}_2 ∧ -b^{66, 10}_1 ∧ -b^{66, 10}_0 ∧ true) 
c  in CNF:
c    -b^{66, 10}_2 ∨  b^{66, 10}_1 ∨  b^{66, 10}_0 ∨ false 
c  in DIMACS:
-17885  17886  17887  0

c  3 does not represent an automaton state.
c    -(-b^{66, 10}_2 ∧  b^{66, 10}_1 ∧  b^{66, 10}_0 ∧ true) 
c  in CNF:
c     b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ false 
c  in DIMACS:
 17885 -17886 -17887  0
c  -3 does not represent an automaton state.
c    -( b^{66, 10}_2 ∧  b^{66, 10}_1 ∧  b^{66, 10}_0 ∧ true) 
c  in CNF:
c    -b^{66, 10}_2 ∨ -b^{66, 10}_1 ∨ -b^{66, 10}_0 ∨ false 
c  in DIMACS:
-17885 -17886 -17887  0

c i = 11
c  -2+1 --> -1
c    ( b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧  p_726) -> ( b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0)
c  in CNF:
c    -b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨  b^{66, 12}_2
c    -b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_1
c    -b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨  b^{66, 12}_0
c  in DIMACS:
-17888 -17889  17890 -726  17891 0
-17888 -17889  17890 -726 -17892 0
-17888 -17889  17890 -726  17893 0

c  -1+1 --> 0
c    ( b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0 ∧  p_726) -> (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧ -b^{66, 12}_0)
c  in CNF:
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_2
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_1
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_0
c  in DIMACS:
-17888  17889 -17890 -726 -17891 0
-17888  17889 -17890 -726 -17892 0
-17888  17889 -17890 -726 -17893 0

c  0+1 --> 1
c    (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧  p_726) -> (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0)
c  in CNF:
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_2
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_1
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨  b^{66, 12}_0
c  in DIMACS:
 17888  17889  17890 -726 -17891 0
 17888  17889  17890 -726 -17892 0
 17888  17889  17890 -726  17893 0

c  1+1 --> 2
c    (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0 ∧  p_726) -> (-b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0)
c  in CNF:
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_2
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨  b^{66, 12}_1
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ -p_726 ∨ -b^{66, 12}_0
c  in DIMACS:
 17888  17889 -17890 -726 -17891 0
 17888  17889 -17890 -726  17892 0
 17888  17889 -17890 -726 -17893 0

c  2+1 --> break 
c    (-b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧  p_726) -> break
c  in CNF:
c     b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 17888 -17889  17890 -726 1162 0


c  2-1 --> 1
c    (-b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧ -p_726) -> (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0)
c  in CNF:
c     b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_2
c     b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_1
c     b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨  b^{66, 12}_0
c  in DIMACS:
 17888 -17889  17890  726 -17891 0
 17888 -17889  17890  726 -17892 0
 17888 -17889  17890  726  17893 0

c  1-1 --> 0
c    (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0 ∧ -p_726) -> (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧ -b^{66, 12}_0)
c  in CNF:
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_2
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_1
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_0
c  in DIMACS:
 17888  17889 -17890  726 -17891 0
 17888  17889 -17890  726 -17892 0
 17888  17889 -17890  726 -17893 0

c  0-1 --> -1
c    (-b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧ -p_726) -> ( b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0)
c  in CNF:
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨  b^{66, 12}_2
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_1
c     b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨  b^{66, 12}_0
c  in DIMACS:
 17888  17889  17890  726  17891 0
 17888  17889  17890  726 -17892 0
 17888  17889  17890  726  17893 0

c  -1-1 --> -2
c    ( b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧  b^{66, 11}_0 ∧ -p_726) -> ( b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0)
c  in CNF:
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨  b^{66, 12}_2
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨  b^{66, 12}_1
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨  p_726 ∨ -b^{66, 12}_0
c  in DIMACS:
-17888  17889 -17890  726  17891 0
-17888  17889 -17890  726  17892 0
-17888  17889 -17890  726 -17893 0

c  -2-1 --> break 
c    ( b^{66, 11}_2 ∧  b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨  b^{66, 11}_0 ∨  p_726 ∨ break
c  in DIMACS:
-17888 -17889  17890  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 11}_2 ∧ -b^{66, 11}_1 ∧ -b^{66, 11}_0 ∧ true) 
c  in CNF:
c    -b^{66, 11}_2 ∨  b^{66, 11}_1 ∨  b^{66, 11}_0 ∨ false 
c  in DIMACS:
-17888  17889  17890  0

c  3 does not represent an automaton state.
c    -(-b^{66, 11}_2 ∧  b^{66, 11}_1 ∧  b^{66, 11}_0 ∧ true) 
c  in CNF:
c     b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ false 
c  in DIMACS:
 17888 -17889 -17890  0
c  -3 does not represent an automaton state.
c    -( b^{66, 11}_2 ∧  b^{66, 11}_1 ∧  b^{66, 11}_0 ∧ true) 
c  in CNF:
c    -b^{66, 11}_2 ∨ -b^{66, 11}_1 ∨ -b^{66, 11}_0 ∨ false 
c  in DIMACS:
-17888 -17889 -17890  0

c i = 12
c  -2+1 --> -1
c    ( b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧  p_792) -> ( b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0)
c  in CNF:
c    -b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨  b^{66, 13}_2
c    -b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_1
c    -b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨  b^{66, 13}_0
c  in DIMACS:
-17891 -17892  17893 -792  17894 0
-17891 -17892  17893 -792 -17895 0
-17891 -17892  17893 -792  17896 0

c  -1+1 --> 0
c    ( b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0 ∧  p_792) -> (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧ -b^{66, 13}_0)
c  in CNF:
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_2
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_1
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_0
c  in DIMACS:
-17891  17892 -17893 -792 -17894 0
-17891  17892 -17893 -792 -17895 0
-17891  17892 -17893 -792 -17896 0

c  0+1 --> 1
c    (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧  p_792) -> (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0)
c  in CNF:
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_2
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_1
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨  b^{66, 13}_0
c  in DIMACS:
 17891  17892  17893 -792 -17894 0
 17891  17892  17893 -792 -17895 0
 17891  17892  17893 -792  17896 0

c  1+1 --> 2
c    (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0 ∧  p_792) -> (-b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0)
c  in CNF:
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_2
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨  b^{66, 13}_1
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ -p_792 ∨ -b^{66, 13}_0
c  in DIMACS:
 17891  17892 -17893 -792 -17894 0
 17891  17892 -17893 -792  17895 0
 17891  17892 -17893 -792 -17896 0

c  2+1 --> break 
c    (-b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧  p_792) -> break
c  in CNF:
c     b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 17891 -17892  17893 -792 1162 0


c  2-1 --> 1
c    (-b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧ -p_792) -> (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0)
c  in CNF:
c     b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_2
c     b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_1
c     b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨  b^{66, 13}_0
c  in DIMACS:
 17891 -17892  17893  792 -17894 0
 17891 -17892  17893  792 -17895 0
 17891 -17892  17893  792  17896 0

c  1-1 --> 0
c    (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0 ∧ -p_792) -> (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧ -b^{66, 13}_0)
c  in CNF:
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_2
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_1
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_0
c  in DIMACS:
 17891  17892 -17893  792 -17894 0
 17891  17892 -17893  792 -17895 0
 17891  17892 -17893  792 -17896 0

c  0-1 --> -1
c    (-b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧ -p_792) -> ( b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0)
c  in CNF:
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨  b^{66, 13}_2
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_1
c     b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨  b^{66, 13}_0
c  in DIMACS:
 17891  17892  17893  792  17894 0
 17891  17892  17893  792 -17895 0
 17891  17892  17893  792  17896 0

c  -1-1 --> -2
c    ( b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧  b^{66, 12}_0 ∧ -p_792) -> ( b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0)
c  in CNF:
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨  b^{66, 13}_2
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨  b^{66, 13}_1
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨  p_792 ∨ -b^{66, 13}_0
c  in DIMACS:
-17891  17892 -17893  792  17894 0
-17891  17892 -17893  792  17895 0
-17891  17892 -17893  792 -17896 0

c  -2-1 --> break 
c    ( b^{66, 12}_2 ∧  b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨  b^{66, 12}_0 ∨  p_792 ∨ break
c  in DIMACS:
-17891 -17892  17893  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 12}_2 ∧ -b^{66, 12}_1 ∧ -b^{66, 12}_0 ∧ true) 
c  in CNF:
c    -b^{66, 12}_2 ∨  b^{66, 12}_1 ∨  b^{66, 12}_0 ∨ false 
c  in DIMACS:
-17891  17892  17893  0

c  3 does not represent an automaton state.
c    -(-b^{66, 12}_2 ∧  b^{66, 12}_1 ∧  b^{66, 12}_0 ∧ true) 
c  in CNF:
c     b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ false 
c  in DIMACS:
 17891 -17892 -17893  0
c  -3 does not represent an automaton state.
c    -( b^{66, 12}_2 ∧  b^{66, 12}_1 ∧  b^{66, 12}_0 ∧ true) 
c  in CNF:
c    -b^{66, 12}_2 ∨ -b^{66, 12}_1 ∨ -b^{66, 12}_0 ∨ false 
c  in DIMACS:
-17891 -17892 -17893  0

c i = 13
c  -2+1 --> -1
c    ( b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧  p_858) -> ( b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0)
c  in CNF:
c    -b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨  b^{66, 14}_2
c    -b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_1
c    -b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨  b^{66, 14}_0
c  in DIMACS:
-17894 -17895  17896 -858  17897 0
-17894 -17895  17896 -858 -17898 0
-17894 -17895  17896 -858  17899 0

c  -1+1 --> 0
c    ( b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0 ∧  p_858) -> (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧ -b^{66, 14}_0)
c  in CNF:
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_2
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_1
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_0
c  in DIMACS:
-17894  17895 -17896 -858 -17897 0
-17894  17895 -17896 -858 -17898 0
-17894  17895 -17896 -858 -17899 0

c  0+1 --> 1
c    (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧  p_858) -> (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0)
c  in CNF:
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_2
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_1
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨  b^{66, 14}_0
c  in DIMACS:
 17894  17895  17896 -858 -17897 0
 17894  17895  17896 -858 -17898 0
 17894  17895  17896 -858  17899 0

c  1+1 --> 2
c    (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0 ∧  p_858) -> (-b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0)
c  in CNF:
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_2
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨  b^{66, 14}_1
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ -p_858 ∨ -b^{66, 14}_0
c  in DIMACS:
 17894  17895 -17896 -858 -17897 0
 17894  17895 -17896 -858  17898 0
 17894  17895 -17896 -858 -17899 0

c  2+1 --> break 
c    (-b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧  p_858) -> break
c  in CNF:
c     b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 17894 -17895  17896 -858 1162 0


c  2-1 --> 1
c    (-b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧ -p_858) -> (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0)
c  in CNF:
c     b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_2
c     b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_1
c     b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨  b^{66, 14}_0
c  in DIMACS:
 17894 -17895  17896  858 -17897 0
 17894 -17895  17896  858 -17898 0
 17894 -17895  17896  858  17899 0

c  1-1 --> 0
c    (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0 ∧ -p_858) -> (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧ -b^{66, 14}_0)
c  in CNF:
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_2
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_1
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_0
c  in DIMACS:
 17894  17895 -17896  858 -17897 0
 17894  17895 -17896  858 -17898 0
 17894  17895 -17896  858 -17899 0

c  0-1 --> -1
c    (-b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧ -p_858) -> ( b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0)
c  in CNF:
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨  b^{66, 14}_2
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_1
c     b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨  b^{66, 14}_0
c  in DIMACS:
 17894  17895  17896  858  17897 0
 17894  17895  17896  858 -17898 0
 17894  17895  17896  858  17899 0

c  -1-1 --> -2
c    ( b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧  b^{66, 13}_0 ∧ -p_858) -> ( b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0)
c  in CNF:
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨  b^{66, 14}_2
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨  b^{66, 14}_1
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨  p_858 ∨ -b^{66, 14}_0
c  in DIMACS:
-17894  17895 -17896  858  17897 0
-17894  17895 -17896  858  17898 0
-17894  17895 -17896  858 -17899 0

c  -2-1 --> break 
c    ( b^{66, 13}_2 ∧  b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨  b^{66, 13}_0 ∨  p_858 ∨ break
c  in DIMACS:
-17894 -17895  17896  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 13}_2 ∧ -b^{66, 13}_1 ∧ -b^{66, 13}_0 ∧ true) 
c  in CNF:
c    -b^{66, 13}_2 ∨  b^{66, 13}_1 ∨  b^{66, 13}_0 ∨ false 
c  in DIMACS:
-17894  17895  17896  0

c  3 does not represent an automaton state.
c    -(-b^{66, 13}_2 ∧  b^{66, 13}_1 ∧  b^{66, 13}_0 ∧ true) 
c  in CNF:
c     b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ false 
c  in DIMACS:
 17894 -17895 -17896  0
c  -3 does not represent an automaton state.
c    -( b^{66, 13}_2 ∧  b^{66, 13}_1 ∧  b^{66, 13}_0 ∧ true) 
c  in CNF:
c    -b^{66, 13}_2 ∨ -b^{66, 13}_1 ∨ -b^{66, 13}_0 ∨ false 
c  in DIMACS:
-17894 -17895 -17896  0

c i = 14
c  -2+1 --> -1
c    ( b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧  p_924) -> ( b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0)
c  in CNF:
c    -b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨  b^{66, 15}_2
c    -b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_1
c    -b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨  b^{66, 15}_0
c  in DIMACS:
-17897 -17898  17899 -924  17900 0
-17897 -17898  17899 -924 -17901 0
-17897 -17898  17899 -924  17902 0

c  -1+1 --> 0
c    ( b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0 ∧  p_924) -> (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧ -b^{66, 15}_0)
c  in CNF:
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_2
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_1
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_0
c  in DIMACS:
-17897  17898 -17899 -924 -17900 0
-17897  17898 -17899 -924 -17901 0
-17897  17898 -17899 -924 -17902 0

c  0+1 --> 1
c    (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧  p_924) -> (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0)
c  in CNF:
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_2
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_1
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨  b^{66, 15}_0
c  in DIMACS:
 17897  17898  17899 -924 -17900 0
 17897  17898  17899 -924 -17901 0
 17897  17898  17899 -924  17902 0

c  1+1 --> 2
c    (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0 ∧  p_924) -> (-b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0)
c  in CNF:
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_2
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨  b^{66, 15}_1
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ -p_924 ∨ -b^{66, 15}_0
c  in DIMACS:
 17897  17898 -17899 -924 -17900 0
 17897  17898 -17899 -924  17901 0
 17897  17898 -17899 -924 -17902 0

c  2+1 --> break 
c    (-b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧  p_924) -> break
c  in CNF:
c     b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 17897 -17898  17899 -924 1162 0


c  2-1 --> 1
c    (-b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧ -p_924) -> (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0)
c  in CNF:
c     b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_2
c     b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_1
c     b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨  b^{66, 15}_0
c  in DIMACS:
 17897 -17898  17899  924 -17900 0
 17897 -17898  17899  924 -17901 0
 17897 -17898  17899  924  17902 0

c  1-1 --> 0
c    (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0 ∧ -p_924) -> (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧ -b^{66, 15}_0)
c  in CNF:
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_2
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_1
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_0
c  in DIMACS:
 17897  17898 -17899  924 -17900 0
 17897  17898 -17899  924 -17901 0
 17897  17898 -17899  924 -17902 0

c  0-1 --> -1
c    (-b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧ -p_924) -> ( b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0)
c  in CNF:
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨  b^{66, 15}_2
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_1
c     b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨  b^{66, 15}_0
c  in DIMACS:
 17897  17898  17899  924  17900 0
 17897  17898  17899  924 -17901 0
 17897  17898  17899  924  17902 0

c  -1-1 --> -2
c    ( b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧  b^{66, 14}_0 ∧ -p_924) -> ( b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0)
c  in CNF:
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨  b^{66, 15}_2
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨  b^{66, 15}_1
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨  p_924 ∨ -b^{66, 15}_0
c  in DIMACS:
-17897  17898 -17899  924  17900 0
-17897  17898 -17899  924  17901 0
-17897  17898 -17899  924 -17902 0

c  -2-1 --> break 
c    ( b^{66, 14}_2 ∧  b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨  b^{66, 14}_0 ∨  p_924 ∨ break
c  in DIMACS:
-17897 -17898  17899  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 14}_2 ∧ -b^{66, 14}_1 ∧ -b^{66, 14}_0 ∧ true) 
c  in CNF:
c    -b^{66, 14}_2 ∨  b^{66, 14}_1 ∨  b^{66, 14}_0 ∨ false 
c  in DIMACS:
-17897  17898  17899  0

c  3 does not represent an automaton state.
c    -(-b^{66, 14}_2 ∧  b^{66, 14}_1 ∧  b^{66, 14}_0 ∧ true) 
c  in CNF:
c     b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ false 
c  in DIMACS:
 17897 -17898 -17899  0
c  -3 does not represent an automaton state.
c    -( b^{66, 14}_2 ∧  b^{66, 14}_1 ∧  b^{66, 14}_0 ∧ true) 
c  in CNF:
c    -b^{66, 14}_2 ∨ -b^{66, 14}_1 ∨ -b^{66, 14}_0 ∨ false 
c  in DIMACS:
-17897 -17898 -17899  0

c i = 15
c  -2+1 --> -1
c    ( b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧  p_990) -> ( b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0)
c  in CNF:
c    -b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨  b^{66, 16}_2
c    -b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_1
c    -b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨  b^{66, 16}_0
c  in DIMACS:
-17900 -17901  17902 -990  17903 0
-17900 -17901  17902 -990 -17904 0
-17900 -17901  17902 -990  17905 0

c  -1+1 --> 0
c    ( b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0 ∧  p_990) -> (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧ -b^{66, 16}_0)
c  in CNF:
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_2
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_1
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_0
c  in DIMACS:
-17900  17901 -17902 -990 -17903 0
-17900  17901 -17902 -990 -17904 0
-17900  17901 -17902 -990 -17905 0

c  0+1 --> 1
c    (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧  p_990) -> (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0)
c  in CNF:
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_2
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_1
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨  b^{66, 16}_0
c  in DIMACS:
 17900  17901  17902 -990 -17903 0
 17900  17901  17902 -990 -17904 0
 17900  17901  17902 -990  17905 0

c  1+1 --> 2
c    (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0 ∧  p_990) -> (-b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0)
c  in CNF:
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_2
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨  b^{66, 16}_1
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ -p_990 ∨ -b^{66, 16}_0
c  in DIMACS:
 17900  17901 -17902 -990 -17903 0
 17900  17901 -17902 -990  17904 0
 17900  17901 -17902 -990 -17905 0

c  2+1 --> break 
c    (-b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧  p_990) -> break
c  in CNF:
c     b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 17900 -17901  17902 -990 1162 0


c  2-1 --> 1
c    (-b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧ -p_990) -> (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0)
c  in CNF:
c     b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_2
c     b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_1
c     b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨  b^{66, 16}_0
c  in DIMACS:
 17900 -17901  17902  990 -17903 0
 17900 -17901  17902  990 -17904 0
 17900 -17901  17902  990  17905 0

c  1-1 --> 0
c    (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0 ∧ -p_990) -> (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧ -b^{66, 16}_0)
c  in CNF:
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_2
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_1
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_0
c  in DIMACS:
 17900  17901 -17902  990 -17903 0
 17900  17901 -17902  990 -17904 0
 17900  17901 -17902  990 -17905 0

c  0-1 --> -1
c    (-b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧ -p_990) -> ( b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0)
c  in CNF:
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨  b^{66, 16}_2
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_1
c     b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨  b^{66, 16}_0
c  in DIMACS:
 17900  17901  17902  990  17903 0
 17900  17901  17902  990 -17904 0
 17900  17901  17902  990  17905 0

c  -1-1 --> -2
c    ( b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧  b^{66, 15}_0 ∧ -p_990) -> ( b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0)
c  in CNF:
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨  b^{66, 16}_2
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨  b^{66, 16}_1
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨  p_990 ∨ -b^{66, 16}_0
c  in DIMACS:
-17900  17901 -17902  990  17903 0
-17900  17901 -17902  990  17904 0
-17900  17901 -17902  990 -17905 0

c  -2-1 --> break 
c    ( b^{66, 15}_2 ∧  b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨  b^{66, 15}_0 ∨  p_990 ∨ break
c  in DIMACS:
-17900 -17901  17902  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 15}_2 ∧ -b^{66, 15}_1 ∧ -b^{66, 15}_0 ∧ true) 
c  in CNF:
c    -b^{66, 15}_2 ∨  b^{66, 15}_1 ∨  b^{66, 15}_0 ∨ false 
c  in DIMACS:
-17900  17901  17902  0

c  3 does not represent an automaton state.
c    -(-b^{66, 15}_2 ∧  b^{66, 15}_1 ∧  b^{66, 15}_0 ∧ true) 
c  in CNF:
c     b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ false 
c  in DIMACS:
 17900 -17901 -17902  0
c  -3 does not represent an automaton state.
c    -( b^{66, 15}_2 ∧  b^{66, 15}_1 ∧  b^{66, 15}_0 ∧ true) 
c  in CNF:
c    -b^{66, 15}_2 ∨ -b^{66, 15}_1 ∨ -b^{66, 15}_0 ∨ false 
c  in DIMACS:
-17900 -17901 -17902  0

c i = 16
c  -2+1 --> -1
c    ( b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧  p_1056) -> ( b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0)
c  in CNF:
c    -b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨  b^{66, 17}_2
c    -b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_1
c    -b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨  b^{66, 17}_0
c  in DIMACS:
-17903 -17904  17905 -1056  17906 0
-17903 -17904  17905 -1056 -17907 0
-17903 -17904  17905 -1056  17908 0

c  -1+1 --> 0
c    ( b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0 ∧  p_1056) -> (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧ -b^{66, 17}_0)
c  in CNF:
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_2
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_1
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_0
c  in DIMACS:
-17903  17904 -17905 -1056 -17906 0
-17903  17904 -17905 -1056 -17907 0
-17903  17904 -17905 -1056 -17908 0

c  0+1 --> 1
c    (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧  p_1056) -> (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0)
c  in CNF:
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_2
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_1
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨  b^{66, 17}_0
c  in DIMACS:
 17903  17904  17905 -1056 -17906 0
 17903  17904  17905 -1056 -17907 0
 17903  17904  17905 -1056  17908 0

c  1+1 --> 2
c    (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0 ∧  p_1056) -> (-b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0)
c  in CNF:
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_2
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨  b^{66, 17}_1
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ -p_1056 ∨ -b^{66, 17}_0
c  in DIMACS:
 17903  17904 -17905 -1056 -17906 0
 17903  17904 -17905 -1056  17907 0
 17903  17904 -17905 -1056 -17908 0

c  2+1 --> break 
c    (-b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 17903 -17904  17905 -1056 1162 0


c  2-1 --> 1
c    (-b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧ -p_1056) -> (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0)
c  in CNF:
c     b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_2
c     b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_1
c     b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨  b^{66, 17}_0
c  in DIMACS:
 17903 -17904  17905  1056 -17906 0
 17903 -17904  17905  1056 -17907 0
 17903 -17904  17905  1056  17908 0

c  1-1 --> 0
c    (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0 ∧ -p_1056) -> (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧ -b^{66, 17}_0)
c  in CNF:
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_2
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_1
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_0
c  in DIMACS:
 17903  17904 -17905  1056 -17906 0
 17903  17904 -17905  1056 -17907 0
 17903  17904 -17905  1056 -17908 0

c  0-1 --> -1
c    (-b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧ -p_1056) -> ( b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0)
c  in CNF:
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨  b^{66, 17}_2
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_1
c     b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨  b^{66, 17}_0
c  in DIMACS:
 17903  17904  17905  1056  17906 0
 17903  17904  17905  1056 -17907 0
 17903  17904  17905  1056  17908 0

c  -1-1 --> -2
c    ( b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧  b^{66, 16}_0 ∧ -p_1056) -> ( b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0)
c  in CNF:
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨  b^{66, 17}_2
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨  b^{66, 17}_1
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨  p_1056 ∨ -b^{66, 17}_0
c  in DIMACS:
-17903  17904 -17905  1056  17906 0
-17903  17904 -17905  1056  17907 0
-17903  17904 -17905  1056 -17908 0

c  -2-1 --> break 
c    ( b^{66, 16}_2 ∧  b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨  b^{66, 16}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-17903 -17904  17905  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 16}_2 ∧ -b^{66, 16}_1 ∧ -b^{66, 16}_0 ∧ true) 
c  in CNF:
c    -b^{66, 16}_2 ∨  b^{66, 16}_1 ∨  b^{66, 16}_0 ∨ false 
c  in DIMACS:
-17903  17904  17905  0

c  3 does not represent an automaton state.
c    -(-b^{66, 16}_2 ∧  b^{66, 16}_1 ∧  b^{66, 16}_0 ∧ true) 
c  in CNF:
c     b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ false 
c  in DIMACS:
 17903 -17904 -17905  0
c  -3 does not represent an automaton state.
c    -( b^{66, 16}_2 ∧  b^{66, 16}_1 ∧  b^{66, 16}_0 ∧ true) 
c  in CNF:
c    -b^{66, 16}_2 ∨ -b^{66, 16}_1 ∨ -b^{66, 16}_0 ∨ false 
c  in DIMACS:
-17903 -17904 -17905  0

c i = 17
c  -2+1 --> -1
c    ( b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧  p_1122) -> ( b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧  b^{66, 18}_0)
c  in CNF:
c    -b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨  b^{66, 18}_2
c    -b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_1
c    -b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨  b^{66, 18}_0
c  in DIMACS:
-17906 -17907  17908 -1122  17909 0
-17906 -17907  17908 -1122 -17910 0
-17906 -17907  17908 -1122  17911 0

c  -1+1 --> 0
c    ( b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0 ∧  p_1122) -> (-b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧ -b^{66, 18}_0)
c  in CNF:
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_2
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_1
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_0
c  in DIMACS:
-17906  17907 -17908 -1122 -17909 0
-17906  17907 -17908 -1122 -17910 0
-17906  17907 -17908 -1122 -17911 0

c  0+1 --> 1
c    (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧  p_1122) -> (-b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧  b^{66, 18}_0)
c  in CNF:
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_2
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_1
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨  b^{66, 18}_0
c  in DIMACS:
 17906  17907  17908 -1122 -17909 0
 17906  17907  17908 -1122 -17910 0
 17906  17907  17908 -1122  17911 0

c  1+1 --> 2
c    (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0 ∧  p_1122) -> (-b^{66, 18}_2 ∧  b^{66, 18}_1 ∧ -b^{66, 18}_0)
c  in CNF:
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_2
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨  b^{66, 18}_1
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ -p_1122 ∨ -b^{66, 18}_0
c  in DIMACS:
 17906  17907 -17908 -1122 -17909 0
 17906  17907 -17908 -1122  17910 0
 17906  17907 -17908 -1122 -17911 0

c  2+1 --> break 
c    (-b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 17906 -17907  17908 -1122 1162 0


c  2-1 --> 1
c    (-b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧ -p_1122) -> (-b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧  b^{66, 18}_0)
c  in CNF:
c     b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_2
c     b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_1
c     b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨  b^{66, 18}_0
c  in DIMACS:
 17906 -17907  17908  1122 -17909 0
 17906 -17907  17908  1122 -17910 0
 17906 -17907  17908  1122  17911 0

c  1-1 --> 0
c    (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0 ∧ -p_1122) -> (-b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧ -b^{66, 18}_0)
c  in CNF:
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_2
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_1
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_0
c  in DIMACS:
 17906  17907 -17908  1122 -17909 0
 17906  17907 -17908  1122 -17910 0
 17906  17907 -17908  1122 -17911 0

c  0-1 --> -1
c    (-b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧ -p_1122) -> ( b^{66, 18}_2 ∧ -b^{66, 18}_1 ∧  b^{66, 18}_0)
c  in CNF:
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨  b^{66, 18}_2
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_1
c     b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨  b^{66, 18}_0
c  in DIMACS:
 17906  17907  17908  1122  17909 0
 17906  17907  17908  1122 -17910 0
 17906  17907  17908  1122  17911 0

c  -1-1 --> -2
c    ( b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧  b^{66, 17}_0 ∧ -p_1122) -> ( b^{66, 18}_2 ∧  b^{66, 18}_1 ∧ -b^{66, 18}_0)
c  in CNF:
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨  b^{66, 18}_2
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨  b^{66, 18}_1
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨  p_1122 ∨ -b^{66, 18}_0
c  in DIMACS:
-17906  17907 -17908  1122  17909 0
-17906  17907 -17908  1122  17910 0
-17906  17907 -17908  1122 -17911 0

c  -2-1 --> break 
c    ( b^{66, 17}_2 ∧  b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨  b^{66, 17}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-17906 -17907  17908  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{66, 17}_2 ∧ -b^{66, 17}_1 ∧ -b^{66, 17}_0 ∧ true) 
c  in CNF:
c    -b^{66, 17}_2 ∨  b^{66, 17}_1 ∨  b^{66, 17}_0 ∨ false 
c  in DIMACS:
-17906  17907  17908  0

c  3 does not represent an automaton state.
c    -(-b^{66, 17}_2 ∧  b^{66, 17}_1 ∧  b^{66, 17}_0 ∧ true) 
c  in CNF:
c     b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ false 
c  in DIMACS:
 17906 -17907 -17908  0
c  -3 does not represent an automaton state.
c    -( b^{66, 17}_2 ∧  b^{66, 17}_1 ∧  b^{66, 17}_0 ∧ true) 
c  in CNF:
c    -b^{66, 17}_2 ∨ -b^{66, 17}_1 ∨ -b^{66, 17}_0 ∨ false 
c  in DIMACS:
-17906 -17907 -17908  0

c INIT for k = 67
c    -b^{67, 1}_2
c    -b^{67, 1}_1
c    -b^{67, 1}_0
c  in DIMACS:
-17912 0
-17913 0
-17914 0

c Transitions for k = 67
c i = 1
c  -2+1 --> -1
c    ( b^{67, 1}_2 ∧  b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧  p_67) -> ( b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0)
c  in CNF:
c    -b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨  b^{67, 2}_2
c    -b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_1
c    -b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨  b^{67, 2}_0
c  in DIMACS:
-17912 -17913  17914 -67  17915 0
-17912 -17913  17914 -67 -17916 0
-17912 -17913  17914 -67  17917 0

c  -1+1 --> 0
c    ( b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧  b^{67, 1}_0 ∧  p_67) -> (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧ -b^{67, 2}_0)
c  in CNF:
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_2
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_1
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_0
c  in DIMACS:
-17912  17913 -17914 -67 -17915 0
-17912  17913 -17914 -67 -17916 0
-17912  17913 -17914 -67 -17917 0

c  0+1 --> 1
c    (-b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧  p_67) -> (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0)
c  in CNF:
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_2
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_1
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨  b^{67, 2}_0
c  in DIMACS:
 17912  17913  17914 -67 -17915 0
 17912  17913  17914 -67 -17916 0
 17912  17913  17914 -67  17917 0

c  1+1 --> 2
c    (-b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧  b^{67, 1}_0 ∧  p_67) -> (-b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0)
c  in CNF:
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_2
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨  b^{67, 2}_1
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ -p_67 ∨ -b^{67, 2}_0
c  in DIMACS:
 17912  17913 -17914 -67 -17915 0
 17912  17913 -17914 -67  17916 0
 17912  17913 -17914 -67 -17917 0

c  2+1 --> break 
c    (-b^{67, 1}_2 ∧  b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧  p_67) -> break
c  in CNF:
c     b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ -p_67 ∨ break
c  in DIMACS:
 17912 -17913  17914 -67 1162 0


c  2-1 --> 1
c    (-b^{67, 1}_2 ∧  b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧ -p_67) -> (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0)
c  in CNF:
c     b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_2
c     b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_1
c     b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨  b^{67, 2}_0
c  in DIMACS:
 17912 -17913  17914  67 -17915 0
 17912 -17913  17914  67 -17916 0
 17912 -17913  17914  67  17917 0

c  1-1 --> 0
c    (-b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧  b^{67, 1}_0 ∧ -p_67) -> (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧ -b^{67, 2}_0)
c  in CNF:
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_2
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_1
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_0
c  in DIMACS:
 17912  17913 -17914  67 -17915 0
 17912  17913 -17914  67 -17916 0
 17912  17913 -17914  67 -17917 0

c  0-1 --> -1
c    (-b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧ -p_67) -> ( b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0)
c  in CNF:
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨  b^{67, 2}_2
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_1
c     b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨  b^{67, 2}_0
c  in DIMACS:
 17912  17913  17914  67  17915 0
 17912  17913  17914  67 -17916 0
 17912  17913  17914  67  17917 0

c  -1-1 --> -2
c    ( b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧  b^{67, 1}_0 ∧ -p_67) -> ( b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0)
c  in CNF:
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨  b^{67, 2}_2
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨  b^{67, 2}_1
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨  p_67 ∨ -b^{67, 2}_0
c  in DIMACS:
-17912  17913 -17914  67  17915 0
-17912  17913 -17914  67  17916 0
-17912  17913 -17914  67 -17917 0

c  -2-1 --> break 
c    ( b^{67, 1}_2 ∧  b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧ -p_67) -> break
c  in CNF:
c    -b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨  b^{67, 1}_0 ∨  p_67 ∨ break
c  in DIMACS:
-17912 -17913  17914  67 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 1}_2 ∧ -b^{67, 1}_1 ∧ -b^{67, 1}_0 ∧ true) 
c  in CNF:
c    -b^{67, 1}_2 ∨  b^{67, 1}_1 ∨  b^{67, 1}_0 ∨ false 
c  in DIMACS:
-17912  17913  17914  0

c  3 does not represent an automaton state.
c    -(-b^{67, 1}_2 ∧  b^{67, 1}_1 ∧  b^{67, 1}_0 ∧ true) 
c  in CNF:
c     b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ false 
c  in DIMACS:
 17912 -17913 -17914  0
c  -3 does not represent an automaton state.
c    -( b^{67, 1}_2 ∧  b^{67, 1}_1 ∧  b^{67, 1}_0 ∧ true) 
c  in CNF:
c    -b^{67, 1}_2 ∨ -b^{67, 1}_1 ∨ -b^{67, 1}_0 ∨ false 
c  in DIMACS:
-17912 -17913 -17914  0

c i = 2
c  -2+1 --> -1
c    ( b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧  p_134) -> ( b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0)
c  in CNF:
c    -b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨  b^{67, 3}_2
c    -b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_1
c    -b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨  b^{67, 3}_0
c  in DIMACS:
-17915 -17916  17917 -134  17918 0
-17915 -17916  17917 -134 -17919 0
-17915 -17916  17917 -134  17920 0

c  -1+1 --> 0
c    ( b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0 ∧  p_134) -> (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧ -b^{67, 3}_0)
c  in CNF:
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_2
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_1
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_0
c  in DIMACS:
-17915  17916 -17917 -134 -17918 0
-17915  17916 -17917 -134 -17919 0
-17915  17916 -17917 -134 -17920 0

c  0+1 --> 1
c    (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧  p_134) -> (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0)
c  in CNF:
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_2
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_1
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨  b^{67, 3}_0
c  in DIMACS:
 17915  17916  17917 -134 -17918 0
 17915  17916  17917 -134 -17919 0
 17915  17916  17917 -134  17920 0

c  1+1 --> 2
c    (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0 ∧  p_134) -> (-b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0)
c  in CNF:
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_2
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨  b^{67, 3}_1
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ -p_134 ∨ -b^{67, 3}_0
c  in DIMACS:
 17915  17916 -17917 -134 -17918 0
 17915  17916 -17917 -134  17919 0
 17915  17916 -17917 -134 -17920 0

c  2+1 --> break 
c    (-b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧  p_134) -> break
c  in CNF:
c     b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ -p_134 ∨ break
c  in DIMACS:
 17915 -17916  17917 -134 1162 0


c  2-1 --> 1
c    (-b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧ -p_134) -> (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0)
c  in CNF:
c     b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_2
c     b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_1
c     b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨  b^{67, 3}_0
c  in DIMACS:
 17915 -17916  17917  134 -17918 0
 17915 -17916  17917  134 -17919 0
 17915 -17916  17917  134  17920 0

c  1-1 --> 0
c    (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0 ∧ -p_134) -> (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧ -b^{67, 3}_0)
c  in CNF:
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_2
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_1
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_0
c  in DIMACS:
 17915  17916 -17917  134 -17918 0
 17915  17916 -17917  134 -17919 0
 17915  17916 -17917  134 -17920 0

c  0-1 --> -1
c    (-b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧ -p_134) -> ( b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0)
c  in CNF:
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨  b^{67, 3}_2
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_1
c     b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨  b^{67, 3}_0
c  in DIMACS:
 17915  17916  17917  134  17918 0
 17915  17916  17917  134 -17919 0
 17915  17916  17917  134  17920 0

c  -1-1 --> -2
c    ( b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧  b^{67, 2}_0 ∧ -p_134) -> ( b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0)
c  in CNF:
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨  b^{67, 3}_2
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨  b^{67, 3}_1
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨  p_134 ∨ -b^{67, 3}_0
c  in DIMACS:
-17915  17916 -17917  134  17918 0
-17915  17916 -17917  134  17919 0
-17915  17916 -17917  134 -17920 0

c  -2-1 --> break 
c    ( b^{67, 2}_2 ∧  b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧ -p_134) -> break
c  in CNF:
c    -b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨  b^{67, 2}_0 ∨  p_134 ∨ break
c  in DIMACS:
-17915 -17916  17917  134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 2}_2 ∧ -b^{67, 2}_1 ∧ -b^{67, 2}_0 ∧ true) 
c  in CNF:
c    -b^{67, 2}_2 ∨  b^{67, 2}_1 ∨  b^{67, 2}_0 ∨ false 
c  in DIMACS:
-17915  17916  17917  0

c  3 does not represent an automaton state.
c    -(-b^{67, 2}_2 ∧  b^{67, 2}_1 ∧  b^{67, 2}_0 ∧ true) 
c  in CNF:
c     b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ false 
c  in DIMACS:
 17915 -17916 -17917  0
c  -3 does not represent an automaton state.
c    -( b^{67, 2}_2 ∧  b^{67, 2}_1 ∧  b^{67, 2}_0 ∧ true) 
c  in CNF:
c    -b^{67, 2}_2 ∨ -b^{67, 2}_1 ∨ -b^{67, 2}_0 ∨ false 
c  in DIMACS:
-17915 -17916 -17917  0

c i = 3
c  -2+1 --> -1
c    ( b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧  p_201) -> ( b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0)
c  in CNF:
c    -b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨  b^{67, 4}_2
c    -b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_1
c    -b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨  b^{67, 4}_0
c  in DIMACS:
-17918 -17919  17920 -201  17921 0
-17918 -17919  17920 -201 -17922 0
-17918 -17919  17920 -201  17923 0

c  -1+1 --> 0
c    ( b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0 ∧  p_201) -> (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧ -b^{67, 4}_0)
c  in CNF:
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_2
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_1
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_0
c  in DIMACS:
-17918  17919 -17920 -201 -17921 0
-17918  17919 -17920 -201 -17922 0
-17918  17919 -17920 -201 -17923 0

c  0+1 --> 1
c    (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧  p_201) -> (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0)
c  in CNF:
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_2
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_1
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨  b^{67, 4}_0
c  in DIMACS:
 17918  17919  17920 -201 -17921 0
 17918  17919  17920 -201 -17922 0
 17918  17919  17920 -201  17923 0

c  1+1 --> 2
c    (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0 ∧  p_201) -> (-b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0)
c  in CNF:
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_2
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨  b^{67, 4}_1
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ -p_201 ∨ -b^{67, 4}_0
c  in DIMACS:
 17918  17919 -17920 -201 -17921 0
 17918  17919 -17920 -201  17922 0
 17918  17919 -17920 -201 -17923 0

c  2+1 --> break 
c    (-b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧  p_201) -> break
c  in CNF:
c     b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ -p_201 ∨ break
c  in DIMACS:
 17918 -17919  17920 -201 1162 0


c  2-1 --> 1
c    (-b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧ -p_201) -> (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0)
c  in CNF:
c     b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_2
c     b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_1
c     b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨  b^{67, 4}_0
c  in DIMACS:
 17918 -17919  17920  201 -17921 0
 17918 -17919  17920  201 -17922 0
 17918 -17919  17920  201  17923 0

c  1-1 --> 0
c    (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0 ∧ -p_201) -> (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧ -b^{67, 4}_0)
c  in CNF:
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_2
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_1
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_0
c  in DIMACS:
 17918  17919 -17920  201 -17921 0
 17918  17919 -17920  201 -17922 0
 17918  17919 -17920  201 -17923 0

c  0-1 --> -1
c    (-b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧ -p_201) -> ( b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0)
c  in CNF:
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨  b^{67, 4}_2
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_1
c     b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨  b^{67, 4}_0
c  in DIMACS:
 17918  17919  17920  201  17921 0
 17918  17919  17920  201 -17922 0
 17918  17919  17920  201  17923 0

c  -1-1 --> -2
c    ( b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧  b^{67, 3}_0 ∧ -p_201) -> ( b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0)
c  in CNF:
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨  b^{67, 4}_2
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨  b^{67, 4}_1
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨  p_201 ∨ -b^{67, 4}_0
c  in DIMACS:
-17918  17919 -17920  201  17921 0
-17918  17919 -17920  201  17922 0
-17918  17919 -17920  201 -17923 0

c  -2-1 --> break 
c    ( b^{67, 3}_2 ∧  b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧ -p_201) -> break
c  in CNF:
c    -b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨  b^{67, 3}_0 ∨  p_201 ∨ break
c  in DIMACS:
-17918 -17919  17920  201 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 3}_2 ∧ -b^{67, 3}_1 ∧ -b^{67, 3}_0 ∧ true) 
c  in CNF:
c    -b^{67, 3}_2 ∨  b^{67, 3}_1 ∨  b^{67, 3}_0 ∨ false 
c  in DIMACS:
-17918  17919  17920  0

c  3 does not represent an automaton state.
c    -(-b^{67, 3}_2 ∧  b^{67, 3}_1 ∧  b^{67, 3}_0 ∧ true) 
c  in CNF:
c     b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ false 
c  in DIMACS:
 17918 -17919 -17920  0
c  -3 does not represent an automaton state.
c    -( b^{67, 3}_2 ∧  b^{67, 3}_1 ∧  b^{67, 3}_0 ∧ true) 
c  in CNF:
c    -b^{67, 3}_2 ∨ -b^{67, 3}_1 ∨ -b^{67, 3}_0 ∨ false 
c  in DIMACS:
-17918 -17919 -17920  0

c i = 4
c  -2+1 --> -1
c    ( b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧  p_268) -> ( b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0)
c  in CNF:
c    -b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨  b^{67, 5}_2
c    -b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_1
c    -b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨  b^{67, 5}_0
c  in DIMACS:
-17921 -17922  17923 -268  17924 0
-17921 -17922  17923 -268 -17925 0
-17921 -17922  17923 -268  17926 0

c  -1+1 --> 0
c    ( b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0 ∧  p_268) -> (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧ -b^{67, 5}_0)
c  in CNF:
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_2
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_1
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_0
c  in DIMACS:
-17921  17922 -17923 -268 -17924 0
-17921  17922 -17923 -268 -17925 0
-17921  17922 -17923 -268 -17926 0

c  0+1 --> 1
c    (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧  p_268) -> (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0)
c  in CNF:
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_2
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_1
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨  b^{67, 5}_0
c  in DIMACS:
 17921  17922  17923 -268 -17924 0
 17921  17922  17923 -268 -17925 0
 17921  17922  17923 -268  17926 0

c  1+1 --> 2
c    (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0 ∧  p_268) -> (-b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0)
c  in CNF:
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_2
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨  b^{67, 5}_1
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ -p_268 ∨ -b^{67, 5}_0
c  in DIMACS:
 17921  17922 -17923 -268 -17924 0
 17921  17922 -17923 -268  17925 0
 17921  17922 -17923 -268 -17926 0

c  2+1 --> break 
c    (-b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧  p_268) -> break
c  in CNF:
c     b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 17921 -17922  17923 -268 1162 0


c  2-1 --> 1
c    (-b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧ -p_268) -> (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0)
c  in CNF:
c     b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_2
c     b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_1
c     b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨  b^{67, 5}_0
c  in DIMACS:
 17921 -17922  17923  268 -17924 0
 17921 -17922  17923  268 -17925 0
 17921 -17922  17923  268  17926 0

c  1-1 --> 0
c    (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0 ∧ -p_268) -> (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧ -b^{67, 5}_0)
c  in CNF:
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_2
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_1
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_0
c  in DIMACS:
 17921  17922 -17923  268 -17924 0
 17921  17922 -17923  268 -17925 0
 17921  17922 -17923  268 -17926 0

c  0-1 --> -1
c    (-b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧ -p_268) -> ( b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0)
c  in CNF:
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨  b^{67, 5}_2
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_1
c     b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨  b^{67, 5}_0
c  in DIMACS:
 17921  17922  17923  268  17924 0
 17921  17922  17923  268 -17925 0
 17921  17922  17923  268  17926 0

c  -1-1 --> -2
c    ( b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧  b^{67, 4}_0 ∧ -p_268) -> ( b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0)
c  in CNF:
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨  b^{67, 5}_2
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨  b^{67, 5}_1
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨  p_268 ∨ -b^{67, 5}_0
c  in DIMACS:
-17921  17922 -17923  268  17924 0
-17921  17922 -17923  268  17925 0
-17921  17922 -17923  268 -17926 0

c  -2-1 --> break 
c    ( b^{67, 4}_2 ∧  b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨  b^{67, 4}_0 ∨  p_268 ∨ break
c  in DIMACS:
-17921 -17922  17923  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 4}_2 ∧ -b^{67, 4}_1 ∧ -b^{67, 4}_0 ∧ true) 
c  in CNF:
c    -b^{67, 4}_2 ∨  b^{67, 4}_1 ∨  b^{67, 4}_0 ∨ false 
c  in DIMACS:
-17921  17922  17923  0

c  3 does not represent an automaton state.
c    -(-b^{67, 4}_2 ∧  b^{67, 4}_1 ∧  b^{67, 4}_0 ∧ true) 
c  in CNF:
c     b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ false 
c  in DIMACS:
 17921 -17922 -17923  0
c  -3 does not represent an automaton state.
c    -( b^{67, 4}_2 ∧  b^{67, 4}_1 ∧  b^{67, 4}_0 ∧ true) 
c  in CNF:
c    -b^{67, 4}_2 ∨ -b^{67, 4}_1 ∨ -b^{67, 4}_0 ∨ false 
c  in DIMACS:
-17921 -17922 -17923  0

c i = 5
c  -2+1 --> -1
c    ( b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧  p_335) -> ( b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0)
c  in CNF:
c    -b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨  b^{67, 6}_2
c    -b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_1
c    -b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨  b^{67, 6}_0
c  in DIMACS:
-17924 -17925  17926 -335  17927 0
-17924 -17925  17926 -335 -17928 0
-17924 -17925  17926 -335  17929 0

c  -1+1 --> 0
c    ( b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0 ∧  p_335) -> (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧ -b^{67, 6}_0)
c  in CNF:
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_2
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_1
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_0
c  in DIMACS:
-17924  17925 -17926 -335 -17927 0
-17924  17925 -17926 -335 -17928 0
-17924  17925 -17926 -335 -17929 0

c  0+1 --> 1
c    (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧  p_335) -> (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0)
c  in CNF:
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_2
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_1
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨  b^{67, 6}_0
c  in DIMACS:
 17924  17925  17926 -335 -17927 0
 17924  17925  17926 -335 -17928 0
 17924  17925  17926 -335  17929 0

c  1+1 --> 2
c    (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0 ∧  p_335) -> (-b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0)
c  in CNF:
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_2
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨  b^{67, 6}_1
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ -p_335 ∨ -b^{67, 6}_0
c  in DIMACS:
 17924  17925 -17926 -335 -17927 0
 17924  17925 -17926 -335  17928 0
 17924  17925 -17926 -335 -17929 0

c  2+1 --> break 
c    (-b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧  p_335) -> break
c  in CNF:
c     b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ -p_335 ∨ break
c  in DIMACS:
 17924 -17925  17926 -335 1162 0


c  2-1 --> 1
c    (-b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧ -p_335) -> (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0)
c  in CNF:
c     b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_2
c     b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_1
c     b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨  b^{67, 6}_0
c  in DIMACS:
 17924 -17925  17926  335 -17927 0
 17924 -17925  17926  335 -17928 0
 17924 -17925  17926  335  17929 0

c  1-1 --> 0
c    (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0 ∧ -p_335) -> (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧ -b^{67, 6}_0)
c  in CNF:
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_2
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_1
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_0
c  in DIMACS:
 17924  17925 -17926  335 -17927 0
 17924  17925 -17926  335 -17928 0
 17924  17925 -17926  335 -17929 0

c  0-1 --> -1
c    (-b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧ -p_335) -> ( b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0)
c  in CNF:
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨  b^{67, 6}_2
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_1
c     b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨  b^{67, 6}_0
c  in DIMACS:
 17924  17925  17926  335  17927 0
 17924  17925  17926  335 -17928 0
 17924  17925  17926  335  17929 0

c  -1-1 --> -2
c    ( b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧  b^{67, 5}_0 ∧ -p_335) -> ( b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0)
c  in CNF:
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨  b^{67, 6}_2
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨  b^{67, 6}_1
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨  p_335 ∨ -b^{67, 6}_0
c  in DIMACS:
-17924  17925 -17926  335  17927 0
-17924  17925 -17926  335  17928 0
-17924  17925 -17926  335 -17929 0

c  -2-1 --> break 
c    ( b^{67, 5}_2 ∧  b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧ -p_335) -> break
c  in CNF:
c    -b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨  b^{67, 5}_0 ∨  p_335 ∨ break
c  in DIMACS:
-17924 -17925  17926  335 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 5}_2 ∧ -b^{67, 5}_1 ∧ -b^{67, 5}_0 ∧ true) 
c  in CNF:
c    -b^{67, 5}_2 ∨  b^{67, 5}_1 ∨  b^{67, 5}_0 ∨ false 
c  in DIMACS:
-17924  17925  17926  0

c  3 does not represent an automaton state.
c    -(-b^{67, 5}_2 ∧  b^{67, 5}_1 ∧  b^{67, 5}_0 ∧ true) 
c  in CNF:
c     b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ false 
c  in DIMACS:
 17924 -17925 -17926  0
c  -3 does not represent an automaton state.
c    -( b^{67, 5}_2 ∧  b^{67, 5}_1 ∧  b^{67, 5}_0 ∧ true) 
c  in CNF:
c    -b^{67, 5}_2 ∨ -b^{67, 5}_1 ∨ -b^{67, 5}_0 ∨ false 
c  in DIMACS:
-17924 -17925 -17926  0

c i = 6
c  -2+1 --> -1
c    ( b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧  p_402) -> ( b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0)
c  in CNF:
c    -b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨  b^{67, 7}_2
c    -b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_1
c    -b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨  b^{67, 7}_0
c  in DIMACS:
-17927 -17928  17929 -402  17930 0
-17927 -17928  17929 -402 -17931 0
-17927 -17928  17929 -402  17932 0

c  -1+1 --> 0
c    ( b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0 ∧  p_402) -> (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧ -b^{67, 7}_0)
c  in CNF:
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_2
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_1
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_0
c  in DIMACS:
-17927  17928 -17929 -402 -17930 0
-17927  17928 -17929 -402 -17931 0
-17927  17928 -17929 -402 -17932 0

c  0+1 --> 1
c    (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧  p_402) -> (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0)
c  in CNF:
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_2
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_1
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨  b^{67, 7}_0
c  in DIMACS:
 17927  17928  17929 -402 -17930 0
 17927  17928  17929 -402 -17931 0
 17927  17928  17929 -402  17932 0

c  1+1 --> 2
c    (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0 ∧  p_402) -> (-b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0)
c  in CNF:
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_2
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨  b^{67, 7}_1
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ -p_402 ∨ -b^{67, 7}_0
c  in DIMACS:
 17927  17928 -17929 -402 -17930 0
 17927  17928 -17929 -402  17931 0
 17927  17928 -17929 -402 -17932 0

c  2+1 --> break 
c    (-b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧  p_402) -> break
c  in CNF:
c     b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 17927 -17928  17929 -402 1162 0


c  2-1 --> 1
c    (-b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧ -p_402) -> (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0)
c  in CNF:
c     b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_2
c     b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_1
c     b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨  b^{67, 7}_0
c  in DIMACS:
 17927 -17928  17929  402 -17930 0
 17927 -17928  17929  402 -17931 0
 17927 -17928  17929  402  17932 0

c  1-1 --> 0
c    (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0 ∧ -p_402) -> (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧ -b^{67, 7}_0)
c  in CNF:
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_2
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_1
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_0
c  in DIMACS:
 17927  17928 -17929  402 -17930 0
 17927  17928 -17929  402 -17931 0
 17927  17928 -17929  402 -17932 0

c  0-1 --> -1
c    (-b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧ -p_402) -> ( b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0)
c  in CNF:
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨  b^{67, 7}_2
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_1
c     b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨  b^{67, 7}_0
c  in DIMACS:
 17927  17928  17929  402  17930 0
 17927  17928  17929  402 -17931 0
 17927  17928  17929  402  17932 0

c  -1-1 --> -2
c    ( b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧  b^{67, 6}_0 ∧ -p_402) -> ( b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0)
c  in CNF:
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨  b^{67, 7}_2
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨  b^{67, 7}_1
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨  p_402 ∨ -b^{67, 7}_0
c  in DIMACS:
-17927  17928 -17929  402  17930 0
-17927  17928 -17929  402  17931 0
-17927  17928 -17929  402 -17932 0

c  -2-1 --> break 
c    ( b^{67, 6}_2 ∧  b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨  b^{67, 6}_0 ∨  p_402 ∨ break
c  in DIMACS:
-17927 -17928  17929  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 6}_2 ∧ -b^{67, 6}_1 ∧ -b^{67, 6}_0 ∧ true) 
c  in CNF:
c    -b^{67, 6}_2 ∨  b^{67, 6}_1 ∨  b^{67, 6}_0 ∨ false 
c  in DIMACS:
-17927  17928  17929  0

c  3 does not represent an automaton state.
c    -(-b^{67, 6}_2 ∧  b^{67, 6}_1 ∧  b^{67, 6}_0 ∧ true) 
c  in CNF:
c     b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ false 
c  in DIMACS:
 17927 -17928 -17929  0
c  -3 does not represent an automaton state.
c    -( b^{67, 6}_2 ∧  b^{67, 6}_1 ∧  b^{67, 6}_0 ∧ true) 
c  in CNF:
c    -b^{67, 6}_2 ∨ -b^{67, 6}_1 ∨ -b^{67, 6}_0 ∨ false 
c  in DIMACS:
-17927 -17928 -17929  0

c i = 7
c  -2+1 --> -1
c    ( b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧  p_469) -> ( b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0)
c  in CNF:
c    -b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨  b^{67, 8}_2
c    -b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_1
c    -b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨  b^{67, 8}_0
c  in DIMACS:
-17930 -17931  17932 -469  17933 0
-17930 -17931  17932 -469 -17934 0
-17930 -17931  17932 -469  17935 0

c  -1+1 --> 0
c    ( b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0 ∧  p_469) -> (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧ -b^{67, 8}_0)
c  in CNF:
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_2
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_1
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_0
c  in DIMACS:
-17930  17931 -17932 -469 -17933 0
-17930  17931 -17932 -469 -17934 0
-17930  17931 -17932 -469 -17935 0

c  0+1 --> 1
c    (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧  p_469) -> (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0)
c  in CNF:
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_2
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_1
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨  b^{67, 8}_0
c  in DIMACS:
 17930  17931  17932 -469 -17933 0
 17930  17931  17932 -469 -17934 0
 17930  17931  17932 -469  17935 0

c  1+1 --> 2
c    (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0 ∧  p_469) -> (-b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0)
c  in CNF:
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_2
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨  b^{67, 8}_1
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ -p_469 ∨ -b^{67, 8}_0
c  in DIMACS:
 17930  17931 -17932 -469 -17933 0
 17930  17931 -17932 -469  17934 0
 17930  17931 -17932 -469 -17935 0

c  2+1 --> break 
c    (-b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧  p_469) -> break
c  in CNF:
c     b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ -p_469 ∨ break
c  in DIMACS:
 17930 -17931  17932 -469 1162 0


c  2-1 --> 1
c    (-b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧ -p_469) -> (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0)
c  in CNF:
c     b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_2
c     b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_1
c     b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨  b^{67, 8}_0
c  in DIMACS:
 17930 -17931  17932  469 -17933 0
 17930 -17931  17932  469 -17934 0
 17930 -17931  17932  469  17935 0

c  1-1 --> 0
c    (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0 ∧ -p_469) -> (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧ -b^{67, 8}_0)
c  in CNF:
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_2
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_1
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_0
c  in DIMACS:
 17930  17931 -17932  469 -17933 0
 17930  17931 -17932  469 -17934 0
 17930  17931 -17932  469 -17935 0

c  0-1 --> -1
c    (-b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧ -p_469) -> ( b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0)
c  in CNF:
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨  b^{67, 8}_2
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_1
c     b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨  b^{67, 8}_0
c  in DIMACS:
 17930  17931  17932  469  17933 0
 17930  17931  17932  469 -17934 0
 17930  17931  17932  469  17935 0

c  -1-1 --> -2
c    ( b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧  b^{67, 7}_0 ∧ -p_469) -> ( b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0)
c  in CNF:
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨  b^{67, 8}_2
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨  b^{67, 8}_1
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨  p_469 ∨ -b^{67, 8}_0
c  in DIMACS:
-17930  17931 -17932  469  17933 0
-17930  17931 -17932  469  17934 0
-17930  17931 -17932  469 -17935 0

c  -2-1 --> break 
c    ( b^{67, 7}_2 ∧  b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧ -p_469) -> break
c  in CNF:
c    -b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨  b^{67, 7}_0 ∨  p_469 ∨ break
c  in DIMACS:
-17930 -17931  17932  469 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 7}_2 ∧ -b^{67, 7}_1 ∧ -b^{67, 7}_0 ∧ true) 
c  in CNF:
c    -b^{67, 7}_2 ∨  b^{67, 7}_1 ∨  b^{67, 7}_0 ∨ false 
c  in DIMACS:
-17930  17931  17932  0

c  3 does not represent an automaton state.
c    -(-b^{67, 7}_2 ∧  b^{67, 7}_1 ∧  b^{67, 7}_0 ∧ true) 
c  in CNF:
c     b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ false 
c  in DIMACS:
 17930 -17931 -17932  0
c  -3 does not represent an automaton state.
c    -( b^{67, 7}_2 ∧  b^{67, 7}_1 ∧  b^{67, 7}_0 ∧ true) 
c  in CNF:
c    -b^{67, 7}_2 ∨ -b^{67, 7}_1 ∨ -b^{67, 7}_0 ∨ false 
c  in DIMACS:
-17930 -17931 -17932  0

c i = 8
c  -2+1 --> -1
c    ( b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧  p_536) -> ( b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0)
c  in CNF:
c    -b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨  b^{67, 9}_2
c    -b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_1
c    -b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨  b^{67, 9}_0
c  in DIMACS:
-17933 -17934  17935 -536  17936 0
-17933 -17934  17935 -536 -17937 0
-17933 -17934  17935 -536  17938 0

c  -1+1 --> 0
c    ( b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0 ∧  p_536) -> (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧ -b^{67, 9}_0)
c  in CNF:
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_2
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_1
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_0
c  in DIMACS:
-17933  17934 -17935 -536 -17936 0
-17933  17934 -17935 -536 -17937 0
-17933  17934 -17935 -536 -17938 0

c  0+1 --> 1
c    (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧  p_536) -> (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0)
c  in CNF:
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_2
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_1
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨  b^{67, 9}_0
c  in DIMACS:
 17933  17934  17935 -536 -17936 0
 17933  17934  17935 -536 -17937 0
 17933  17934  17935 -536  17938 0

c  1+1 --> 2
c    (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0 ∧  p_536) -> (-b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0)
c  in CNF:
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_2
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨  b^{67, 9}_1
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ -p_536 ∨ -b^{67, 9}_0
c  in DIMACS:
 17933  17934 -17935 -536 -17936 0
 17933  17934 -17935 -536  17937 0
 17933  17934 -17935 -536 -17938 0

c  2+1 --> break 
c    (-b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧  p_536) -> break
c  in CNF:
c     b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 17933 -17934  17935 -536 1162 0


c  2-1 --> 1
c    (-b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧ -p_536) -> (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0)
c  in CNF:
c     b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_2
c     b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_1
c     b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨  b^{67, 9}_0
c  in DIMACS:
 17933 -17934  17935  536 -17936 0
 17933 -17934  17935  536 -17937 0
 17933 -17934  17935  536  17938 0

c  1-1 --> 0
c    (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0 ∧ -p_536) -> (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧ -b^{67, 9}_0)
c  in CNF:
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_2
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_1
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_0
c  in DIMACS:
 17933  17934 -17935  536 -17936 0
 17933  17934 -17935  536 -17937 0
 17933  17934 -17935  536 -17938 0

c  0-1 --> -1
c    (-b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧ -p_536) -> ( b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0)
c  in CNF:
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨  b^{67, 9}_2
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_1
c     b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨  b^{67, 9}_0
c  in DIMACS:
 17933  17934  17935  536  17936 0
 17933  17934  17935  536 -17937 0
 17933  17934  17935  536  17938 0

c  -1-1 --> -2
c    ( b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧  b^{67, 8}_0 ∧ -p_536) -> ( b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0)
c  in CNF:
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨  b^{67, 9}_2
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨  b^{67, 9}_1
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨  p_536 ∨ -b^{67, 9}_0
c  in DIMACS:
-17933  17934 -17935  536  17936 0
-17933  17934 -17935  536  17937 0
-17933  17934 -17935  536 -17938 0

c  -2-1 --> break 
c    ( b^{67, 8}_2 ∧  b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨  b^{67, 8}_0 ∨  p_536 ∨ break
c  in DIMACS:
-17933 -17934  17935  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 8}_2 ∧ -b^{67, 8}_1 ∧ -b^{67, 8}_0 ∧ true) 
c  in CNF:
c    -b^{67, 8}_2 ∨  b^{67, 8}_1 ∨  b^{67, 8}_0 ∨ false 
c  in DIMACS:
-17933  17934  17935  0

c  3 does not represent an automaton state.
c    -(-b^{67, 8}_2 ∧  b^{67, 8}_1 ∧  b^{67, 8}_0 ∧ true) 
c  in CNF:
c     b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ false 
c  in DIMACS:
 17933 -17934 -17935  0
c  -3 does not represent an automaton state.
c    -( b^{67, 8}_2 ∧  b^{67, 8}_1 ∧  b^{67, 8}_0 ∧ true) 
c  in CNF:
c    -b^{67, 8}_2 ∨ -b^{67, 8}_1 ∨ -b^{67, 8}_0 ∨ false 
c  in DIMACS:
-17933 -17934 -17935  0

c i = 9
c  -2+1 --> -1
c    ( b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧  p_603) -> ( b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0)
c  in CNF:
c    -b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨  b^{67, 10}_2
c    -b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_1
c    -b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨  b^{67, 10}_0
c  in DIMACS:
-17936 -17937  17938 -603  17939 0
-17936 -17937  17938 -603 -17940 0
-17936 -17937  17938 -603  17941 0

c  -1+1 --> 0
c    ( b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0 ∧  p_603) -> (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧ -b^{67, 10}_0)
c  in CNF:
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_2
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_1
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_0
c  in DIMACS:
-17936  17937 -17938 -603 -17939 0
-17936  17937 -17938 -603 -17940 0
-17936  17937 -17938 -603 -17941 0

c  0+1 --> 1
c    (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧  p_603) -> (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0)
c  in CNF:
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_2
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_1
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨  b^{67, 10}_0
c  in DIMACS:
 17936  17937  17938 -603 -17939 0
 17936  17937  17938 -603 -17940 0
 17936  17937  17938 -603  17941 0

c  1+1 --> 2
c    (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0 ∧  p_603) -> (-b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0)
c  in CNF:
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_2
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨  b^{67, 10}_1
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ -p_603 ∨ -b^{67, 10}_0
c  in DIMACS:
 17936  17937 -17938 -603 -17939 0
 17936  17937 -17938 -603  17940 0
 17936  17937 -17938 -603 -17941 0

c  2+1 --> break 
c    (-b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧  p_603) -> break
c  in CNF:
c     b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ -p_603 ∨ break
c  in DIMACS:
 17936 -17937  17938 -603 1162 0


c  2-1 --> 1
c    (-b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧ -p_603) -> (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0)
c  in CNF:
c     b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_2
c     b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_1
c     b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨  b^{67, 10}_0
c  in DIMACS:
 17936 -17937  17938  603 -17939 0
 17936 -17937  17938  603 -17940 0
 17936 -17937  17938  603  17941 0

c  1-1 --> 0
c    (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0 ∧ -p_603) -> (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧ -b^{67, 10}_0)
c  in CNF:
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_2
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_1
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_0
c  in DIMACS:
 17936  17937 -17938  603 -17939 0
 17936  17937 -17938  603 -17940 0
 17936  17937 -17938  603 -17941 0

c  0-1 --> -1
c    (-b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧ -p_603) -> ( b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0)
c  in CNF:
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨  b^{67, 10}_2
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_1
c     b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨  b^{67, 10}_0
c  in DIMACS:
 17936  17937  17938  603  17939 0
 17936  17937  17938  603 -17940 0
 17936  17937  17938  603  17941 0

c  -1-1 --> -2
c    ( b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧  b^{67, 9}_0 ∧ -p_603) -> ( b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0)
c  in CNF:
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨  b^{67, 10}_2
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨  b^{67, 10}_1
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨  p_603 ∨ -b^{67, 10}_0
c  in DIMACS:
-17936  17937 -17938  603  17939 0
-17936  17937 -17938  603  17940 0
-17936  17937 -17938  603 -17941 0

c  -2-1 --> break 
c    ( b^{67, 9}_2 ∧  b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧ -p_603) -> break
c  in CNF:
c    -b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨  b^{67, 9}_0 ∨  p_603 ∨ break
c  in DIMACS:
-17936 -17937  17938  603 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 9}_2 ∧ -b^{67, 9}_1 ∧ -b^{67, 9}_0 ∧ true) 
c  in CNF:
c    -b^{67, 9}_2 ∨  b^{67, 9}_1 ∨  b^{67, 9}_0 ∨ false 
c  in DIMACS:
-17936  17937  17938  0

c  3 does not represent an automaton state.
c    -(-b^{67, 9}_2 ∧  b^{67, 9}_1 ∧  b^{67, 9}_0 ∧ true) 
c  in CNF:
c     b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ false 
c  in DIMACS:
 17936 -17937 -17938  0
c  -3 does not represent an automaton state.
c    -( b^{67, 9}_2 ∧  b^{67, 9}_1 ∧  b^{67, 9}_0 ∧ true) 
c  in CNF:
c    -b^{67, 9}_2 ∨ -b^{67, 9}_1 ∨ -b^{67, 9}_0 ∨ false 
c  in DIMACS:
-17936 -17937 -17938  0

c i = 10
c  -2+1 --> -1
c    ( b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧  p_670) -> ( b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0)
c  in CNF:
c    -b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨  b^{67, 11}_2
c    -b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_1
c    -b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨  b^{67, 11}_0
c  in DIMACS:
-17939 -17940  17941 -670  17942 0
-17939 -17940  17941 -670 -17943 0
-17939 -17940  17941 -670  17944 0

c  -1+1 --> 0
c    ( b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0 ∧  p_670) -> (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧ -b^{67, 11}_0)
c  in CNF:
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_2
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_1
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_0
c  in DIMACS:
-17939  17940 -17941 -670 -17942 0
-17939  17940 -17941 -670 -17943 0
-17939  17940 -17941 -670 -17944 0

c  0+1 --> 1
c    (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧  p_670) -> (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0)
c  in CNF:
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_2
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_1
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨  b^{67, 11}_0
c  in DIMACS:
 17939  17940  17941 -670 -17942 0
 17939  17940  17941 -670 -17943 0
 17939  17940  17941 -670  17944 0

c  1+1 --> 2
c    (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0 ∧  p_670) -> (-b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0)
c  in CNF:
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_2
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨  b^{67, 11}_1
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ -p_670 ∨ -b^{67, 11}_0
c  in DIMACS:
 17939  17940 -17941 -670 -17942 0
 17939  17940 -17941 -670  17943 0
 17939  17940 -17941 -670 -17944 0

c  2+1 --> break 
c    (-b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧  p_670) -> break
c  in CNF:
c     b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 17939 -17940  17941 -670 1162 0


c  2-1 --> 1
c    (-b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧ -p_670) -> (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0)
c  in CNF:
c     b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_2
c     b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_1
c     b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨  b^{67, 11}_0
c  in DIMACS:
 17939 -17940  17941  670 -17942 0
 17939 -17940  17941  670 -17943 0
 17939 -17940  17941  670  17944 0

c  1-1 --> 0
c    (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0 ∧ -p_670) -> (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧ -b^{67, 11}_0)
c  in CNF:
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_2
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_1
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_0
c  in DIMACS:
 17939  17940 -17941  670 -17942 0
 17939  17940 -17941  670 -17943 0
 17939  17940 -17941  670 -17944 0

c  0-1 --> -1
c    (-b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧ -p_670) -> ( b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0)
c  in CNF:
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨  b^{67, 11}_2
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_1
c     b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨  b^{67, 11}_0
c  in DIMACS:
 17939  17940  17941  670  17942 0
 17939  17940  17941  670 -17943 0
 17939  17940  17941  670  17944 0

c  -1-1 --> -2
c    ( b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧  b^{67, 10}_0 ∧ -p_670) -> ( b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0)
c  in CNF:
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨  b^{67, 11}_2
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨  b^{67, 11}_1
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨  p_670 ∨ -b^{67, 11}_0
c  in DIMACS:
-17939  17940 -17941  670  17942 0
-17939  17940 -17941  670  17943 0
-17939  17940 -17941  670 -17944 0

c  -2-1 --> break 
c    ( b^{67, 10}_2 ∧  b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨  b^{67, 10}_0 ∨  p_670 ∨ break
c  in DIMACS:
-17939 -17940  17941  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 10}_2 ∧ -b^{67, 10}_1 ∧ -b^{67, 10}_0 ∧ true) 
c  in CNF:
c    -b^{67, 10}_2 ∨  b^{67, 10}_1 ∨  b^{67, 10}_0 ∨ false 
c  in DIMACS:
-17939  17940  17941  0

c  3 does not represent an automaton state.
c    -(-b^{67, 10}_2 ∧  b^{67, 10}_1 ∧  b^{67, 10}_0 ∧ true) 
c  in CNF:
c     b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ false 
c  in DIMACS:
 17939 -17940 -17941  0
c  -3 does not represent an automaton state.
c    -( b^{67, 10}_2 ∧  b^{67, 10}_1 ∧  b^{67, 10}_0 ∧ true) 
c  in CNF:
c    -b^{67, 10}_2 ∨ -b^{67, 10}_1 ∨ -b^{67, 10}_0 ∨ false 
c  in DIMACS:
-17939 -17940 -17941  0

c i = 11
c  -2+1 --> -1
c    ( b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧  p_737) -> ( b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0)
c  in CNF:
c    -b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨  b^{67, 12}_2
c    -b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_1
c    -b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨  b^{67, 12}_0
c  in DIMACS:
-17942 -17943  17944 -737  17945 0
-17942 -17943  17944 -737 -17946 0
-17942 -17943  17944 -737  17947 0

c  -1+1 --> 0
c    ( b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0 ∧  p_737) -> (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧ -b^{67, 12}_0)
c  in CNF:
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_2
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_1
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_0
c  in DIMACS:
-17942  17943 -17944 -737 -17945 0
-17942  17943 -17944 -737 -17946 0
-17942  17943 -17944 -737 -17947 0

c  0+1 --> 1
c    (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧  p_737) -> (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0)
c  in CNF:
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_2
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_1
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨  b^{67, 12}_0
c  in DIMACS:
 17942  17943  17944 -737 -17945 0
 17942  17943  17944 -737 -17946 0
 17942  17943  17944 -737  17947 0

c  1+1 --> 2
c    (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0 ∧  p_737) -> (-b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0)
c  in CNF:
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_2
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨  b^{67, 12}_1
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ -p_737 ∨ -b^{67, 12}_0
c  in DIMACS:
 17942  17943 -17944 -737 -17945 0
 17942  17943 -17944 -737  17946 0
 17942  17943 -17944 -737 -17947 0

c  2+1 --> break 
c    (-b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧  p_737) -> break
c  in CNF:
c     b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ -p_737 ∨ break
c  in DIMACS:
 17942 -17943  17944 -737 1162 0


c  2-1 --> 1
c    (-b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧ -p_737) -> (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0)
c  in CNF:
c     b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_2
c     b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_1
c     b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨  b^{67, 12}_0
c  in DIMACS:
 17942 -17943  17944  737 -17945 0
 17942 -17943  17944  737 -17946 0
 17942 -17943  17944  737  17947 0

c  1-1 --> 0
c    (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0 ∧ -p_737) -> (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧ -b^{67, 12}_0)
c  in CNF:
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_2
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_1
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_0
c  in DIMACS:
 17942  17943 -17944  737 -17945 0
 17942  17943 -17944  737 -17946 0
 17942  17943 -17944  737 -17947 0

c  0-1 --> -1
c    (-b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧ -p_737) -> ( b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0)
c  in CNF:
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨  b^{67, 12}_2
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_1
c     b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨  b^{67, 12}_0
c  in DIMACS:
 17942  17943  17944  737  17945 0
 17942  17943  17944  737 -17946 0
 17942  17943  17944  737  17947 0

c  -1-1 --> -2
c    ( b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧  b^{67, 11}_0 ∧ -p_737) -> ( b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0)
c  in CNF:
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨  b^{67, 12}_2
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨  b^{67, 12}_1
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨  p_737 ∨ -b^{67, 12}_0
c  in DIMACS:
-17942  17943 -17944  737  17945 0
-17942  17943 -17944  737  17946 0
-17942  17943 -17944  737 -17947 0

c  -2-1 --> break 
c    ( b^{67, 11}_2 ∧  b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧ -p_737) -> break
c  in CNF:
c    -b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨  b^{67, 11}_0 ∨  p_737 ∨ break
c  in DIMACS:
-17942 -17943  17944  737 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 11}_2 ∧ -b^{67, 11}_1 ∧ -b^{67, 11}_0 ∧ true) 
c  in CNF:
c    -b^{67, 11}_2 ∨  b^{67, 11}_1 ∨  b^{67, 11}_0 ∨ false 
c  in DIMACS:
-17942  17943  17944  0

c  3 does not represent an automaton state.
c    -(-b^{67, 11}_2 ∧  b^{67, 11}_1 ∧  b^{67, 11}_0 ∧ true) 
c  in CNF:
c     b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ false 
c  in DIMACS:
 17942 -17943 -17944  0
c  -3 does not represent an automaton state.
c    -( b^{67, 11}_2 ∧  b^{67, 11}_1 ∧  b^{67, 11}_0 ∧ true) 
c  in CNF:
c    -b^{67, 11}_2 ∨ -b^{67, 11}_1 ∨ -b^{67, 11}_0 ∨ false 
c  in DIMACS:
-17942 -17943 -17944  0

c i = 12
c  -2+1 --> -1
c    ( b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧  p_804) -> ( b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0)
c  in CNF:
c    -b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨  b^{67, 13}_2
c    -b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_1
c    -b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨  b^{67, 13}_0
c  in DIMACS:
-17945 -17946  17947 -804  17948 0
-17945 -17946  17947 -804 -17949 0
-17945 -17946  17947 -804  17950 0

c  -1+1 --> 0
c    ( b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0 ∧  p_804) -> (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧ -b^{67, 13}_0)
c  in CNF:
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_2
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_1
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_0
c  in DIMACS:
-17945  17946 -17947 -804 -17948 0
-17945  17946 -17947 -804 -17949 0
-17945  17946 -17947 -804 -17950 0

c  0+1 --> 1
c    (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧  p_804) -> (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0)
c  in CNF:
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_2
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_1
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨  b^{67, 13}_0
c  in DIMACS:
 17945  17946  17947 -804 -17948 0
 17945  17946  17947 -804 -17949 0
 17945  17946  17947 -804  17950 0

c  1+1 --> 2
c    (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0 ∧  p_804) -> (-b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0)
c  in CNF:
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_2
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨  b^{67, 13}_1
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ -p_804 ∨ -b^{67, 13}_0
c  in DIMACS:
 17945  17946 -17947 -804 -17948 0
 17945  17946 -17947 -804  17949 0
 17945  17946 -17947 -804 -17950 0

c  2+1 --> break 
c    (-b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧  p_804) -> break
c  in CNF:
c     b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 17945 -17946  17947 -804 1162 0


c  2-1 --> 1
c    (-b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧ -p_804) -> (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0)
c  in CNF:
c     b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_2
c     b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_1
c     b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨  b^{67, 13}_0
c  in DIMACS:
 17945 -17946  17947  804 -17948 0
 17945 -17946  17947  804 -17949 0
 17945 -17946  17947  804  17950 0

c  1-1 --> 0
c    (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0 ∧ -p_804) -> (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧ -b^{67, 13}_0)
c  in CNF:
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_2
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_1
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_0
c  in DIMACS:
 17945  17946 -17947  804 -17948 0
 17945  17946 -17947  804 -17949 0
 17945  17946 -17947  804 -17950 0

c  0-1 --> -1
c    (-b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧ -p_804) -> ( b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0)
c  in CNF:
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨  b^{67, 13}_2
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_1
c     b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨  b^{67, 13}_0
c  in DIMACS:
 17945  17946  17947  804  17948 0
 17945  17946  17947  804 -17949 0
 17945  17946  17947  804  17950 0

c  -1-1 --> -2
c    ( b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧  b^{67, 12}_0 ∧ -p_804) -> ( b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0)
c  in CNF:
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨  b^{67, 13}_2
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨  b^{67, 13}_1
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨  p_804 ∨ -b^{67, 13}_0
c  in DIMACS:
-17945  17946 -17947  804  17948 0
-17945  17946 -17947  804  17949 0
-17945  17946 -17947  804 -17950 0

c  -2-1 --> break 
c    ( b^{67, 12}_2 ∧  b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨  b^{67, 12}_0 ∨  p_804 ∨ break
c  in DIMACS:
-17945 -17946  17947  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 12}_2 ∧ -b^{67, 12}_1 ∧ -b^{67, 12}_0 ∧ true) 
c  in CNF:
c    -b^{67, 12}_2 ∨  b^{67, 12}_1 ∨  b^{67, 12}_0 ∨ false 
c  in DIMACS:
-17945  17946  17947  0

c  3 does not represent an automaton state.
c    -(-b^{67, 12}_2 ∧  b^{67, 12}_1 ∧  b^{67, 12}_0 ∧ true) 
c  in CNF:
c     b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ false 
c  in DIMACS:
 17945 -17946 -17947  0
c  -3 does not represent an automaton state.
c    -( b^{67, 12}_2 ∧  b^{67, 12}_1 ∧  b^{67, 12}_0 ∧ true) 
c  in CNF:
c    -b^{67, 12}_2 ∨ -b^{67, 12}_1 ∨ -b^{67, 12}_0 ∨ false 
c  in DIMACS:
-17945 -17946 -17947  0

c i = 13
c  -2+1 --> -1
c    ( b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧  p_871) -> ( b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0)
c  in CNF:
c    -b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨  b^{67, 14}_2
c    -b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_1
c    -b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨  b^{67, 14}_0
c  in DIMACS:
-17948 -17949  17950 -871  17951 0
-17948 -17949  17950 -871 -17952 0
-17948 -17949  17950 -871  17953 0

c  -1+1 --> 0
c    ( b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0 ∧  p_871) -> (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧ -b^{67, 14}_0)
c  in CNF:
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_2
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_1
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_0
c  in DIMACS:
-17948  17949 -17950 -871 -17951 0
-17948  17949 -17950 -871 -17952 0
-17948  17949 -17950 -871 -17953 0

c  0+1 --> 1
c    (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧  p_871) -> (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0)
c  in CNF:
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_2
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_1
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨  b^{67, 14}_0
c  in DIMACS:
 17948  17949  17950 -871 -17951 0
 17948  17949  17950 -871 -17952 0
 17948  17949  17950 -871  17953 0

c  1+1 --> 2
c    (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0 ∧  p_871) -> (-b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0)
c  in CNF:
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_2
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨  b^{67, 14}_1
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ -p_871 ∨ -b^{67, 14}_0
c  in DIMACS:
 17948  17949 -17950 -871 -17951 0
 17948  17949 -17950 -871  17952 0
 17948  17949 -17950 -871 -17953 0

c  2+1 --> break 
c    (-b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧  p_871) -> break
c  in CNF:
c     b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ -p_871 ∨ break
c  in DIMACS:
 17948 -17949  17950 -871 1162 0


c  2-1 --> 1
c    (-b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧ -p_871) -> (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0)
c  in CNF:
c     b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_2
c     b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_1
c     b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨  b^{67, 14}_0
c  in DIMACS:
 17948 -17949  17950  871 -17951 0
 17948 -17949  17950  871 -17952 0
 17948 -17949  17950  871  17953 0

c  1-1 --> 0
c    (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0 ∧ -p_871) -> (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧ -b^{67, 14}_0)
c  in CNF:
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_2
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_1
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_0
c  in DIMACS:
 17948  17949 -17950  871 -17951 0
 17948  17949 -17950  871 -17952 0
 17948  17949 -17950  871 -17953 0

c  0-1 --> -1
c    (-b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧ -p_871) -> ( b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0)
c  in CNF:
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨  b^{67, 14}_2
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_1
c     b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨  b^{67, 14}_0
c  in DIMACS:
 17948  17949  17950  871  17951 0
 17948  17949  17950  871 -17952 0
 17948  17949  17950  871  17953 0

c  -1-1 --> -2
c    ( b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧  b^{67, 13}_0 ∧ -p_871) -> ( b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0)
c  in CNF:
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨  b^{67, 14}_2
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨  b^{67, 14}_1
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨  p_871 ∨ -b^{67, 14}_0
c  in DIMACS:
-17948  17949 -17950  871  17951 0
-17948  17949 -17950  871  17952 0
-17948  17949 -17950  871 -17953 0

c  -2-1 --> break 
c    ( b^{67, 13}_2 ∧  b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧ -p_871) -> break
c  in CNF:
c    -b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨  b^{67, 13}_0 ∨  p_871 ∨ break
c  in DIMACS:
-17948 -17949  17950  871 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 13}_2 ∧ -b^{67, 13}_1 ∧ -b^{67, 13}_0 ∧ true) 
c  in CNF:
c    -b^{67, 13}_2 ∨  b^{67, 13}_1 ∨  b^{67, 13}_0 ∨ false 
c  in DIMACS:
-17948  17949  17950  0

c  3 does not represent an automaton state.
c    -(-b^{67, 13}_2 ∧  b^{67, 13}_1 ∧  b^{67, 13}_0 ∧ true) 
c  in CNF:
c     b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ false 
c  in DIMACS:
 17948 -17949 -17950  0
c  -3 does not represent an automaton state.
c    -( b^{67, 13}_2 ∧  b^{67, 13}_1 ∧  b^{67, 13}_0 ∧ true) 
c  in CNF:
c    -b^{67, 13}_2 ∨ -b^{67, 13}_1 ∨ -b^{67, 13}_0 ∨ false 
c  in DIMACS:
-17948 -17949 -17950  0

c i = 14
c  -2+1 --> -1
c    ( b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧  p_938) -> ( b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0)
c  in CNF:
c    -b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨  b^{67, 15}_2
c    -b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_1
c    -b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨  b^{67, 15}_0
c  in DIMACS:
-17951 -17952  17953 -938  17954 0
-17951 -17952  17953 -938 -17955 0
-17951 -17952  17953 -938  17956 0

c  -1+1 --> 0
c    ( b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0 ∧  p_938) -> (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧ -b^{67, 15}_0)
c  in CNF:
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_2
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_1
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_0
c  in DIMACS:
-17951  17952 -17953 -938 -17954 0
-17951  17952 -17953 -938 -17955 0
-17951  17952 -17953 -938 -17956 0

c  0+1 --> 1
c    (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧  p_938) -> (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0)
c  in CNF:
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_2
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_1
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨  b^{67, 15}_0
c  in DIMACS:
 17951  17952  17953 -938 -17954 0
 17951  17952  17953 -938 -17955 0
 17951  17952  17953 -938  17956 0

c  1+1 --> 2
c    (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0 ∧  p_938) -> (-b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0)
c  in CNF:
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_2
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨  b^{67, 15}_1
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ -p_938 ∨ -b^{67, 15}_0
c  in DIMACS:
 17951  17952 -17953 -938 -17954 0
 17951  17952 -17953 -938  17955 0
 17951  17952 -17953 -938 -17956 0

c  2+1 --> break 
c    (-b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧  p_938) -> break
c  in CNF:
c     b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 17951 -17952  17953 -938 1162 0


c  2-1 --> 1
c    (-b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧ -p_938) -> (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0)
c  in CNF:
c     b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_2
c     b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_1
c     b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨  b^{67, 15}_0
c  in DIMACS:
 17951 -17952  17953  938 -17954 0
 17951 -17952  17953  938 -17955 0
 17951 -17952  17953  938  17956 0

c  1-1 --> 0
c    (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0 ∧ -p_938) -> (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧ -b^{67, 15}_0)
c  in CNF:
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_2
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_1
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_0
c  in DIMACS:
 17951  17952 -17953  938 -17954 0
 17951  17952 -17953  938 -17955 0
 17951  17952 -17953  938 -17956 0

c  0-1 --> -1
c    (-b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧ -p_938) -> ( b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0)
c  in CNF:
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨  b^{67, 15}_2
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_1
c     b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨  b^{67, 15}_0
c  in DIMACS:
 17951  17952  17953  938  17954 0
 17951  17952  17953  938 -17955 0
 17951  17952  17953  938  17956 0

c  -1-1 --> -2
c    ( b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧  b^{67, 14}_0 ∧ -p_938) -> ( b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0)
c  in CNF:
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨  b^{67, 15}_2
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨  b^{67, 15}_1
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨  p_938 ∨ -b^{67, 15}_0
c  in DIMACS:
-17951  17952 -17953  938  17954 0
-17951  17952 -17953  938  17955 0
-17951  17952 -17953  938 -17956 0

c  -2-1 --> break 
c    ( b^{67, 14}_2 ∧  b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨  b^{67, 14}_0 ∨  p_938 ∨ break
c  in DIMACS:
-17951 -17952  17953  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 14}_2 ∧ -b^{67, 14}_1 ∧ -b^{67, 14}_0 ∧ true) 
c  in CNF:
c    -b^{67, 14}_2 ∨  b^{67, 14}_1 ∨  b^{67, 14}_0 ∨ false 
c  in DIMACS:
-17951  17952  17953  0

c  3 does not represent an automaton state.
c    -(-b^{67, 14}_2 ∧  b^{67, 14}_1 ∧  b^{67, 14}_0 ∧ true) 
c  in CNF:
c     b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ false 
c  in DIMACS:
 17951 -17952 -17953  0
c  -3 does not represent an automaton state.
c    -( b^{67, 14}_2 ∧  b^{67, 14}_1 ∧  b^{67, 14}_0 ∧ true) 
c  in CNF:
c    -b^{67, 14}_2 ∨ -b^{67, 14}_1 ∨ -b^{67, 14}_0 ∨ false 
c  in DIMACS:
-17951 -17952 -17953  0

c i = 15
c  -2+1 --> -1
c    ( b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧  p_1005) -> ( b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0)
c  in CNF:
c    -b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨  b^{67, 16}_2
c    -b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_1
c    -b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨  b^{67, 16}_0
c  in DIMACS:
-17954 -17955  17956 -1005  17957 0
-17954 -17955  17956 -1005 -17958 0
-17954 -17955  17956 -1005  17959 0

c  -1+1 --> 0
c    ( b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0 ∧  p_1005) -> (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧ -b^{67, 16}_0)
c  in CNF:
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_2
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_1
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_0
c  in DIMACS:
-17954  17955 -17956 -1005 -17957 0
-17954  17955 -17956 -1005 -17958 0
-17954  17955 -17956 -1005 -17959 0

c  0+1 --> 1
c    (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧  p_1005) -> (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0)
c  in CNF:
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_2
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_1
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨  b^{67, 16}_0
c  in DIMACS:
 17954  17955  17956 -1005 -17957 0
 17954  17955  17956 -1005 -17958 0
 17954  17955  17956 -1005  17959 0

c  1+1 --> 2
c    (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0 ∧  p_1005) -> (-b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0)
c  in CNF:
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_2
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨  b^{67, 16}_1
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ -p_1005 ∨ -b^{67, 16}_0
c  in DIMACS:
 17954  17955 -17956 -1005 -17957 0
 17954  17955 -17956 -1005  17958 0
 17954  17955 -17956 -1005 -17959 0

c  2+1 --> break 
c    (-b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 17954 -17955  17956 -1005 1162 0


c  2-1 --> 1
c    (-b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧ -p_1005) -> (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0)
c  in CNF:
c     b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_2
c     b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_1
c     b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨  b^{67, 16}_0
c  in DIMACS:
 17954 -17955  17956  1005 -17957 0
 17954 -17955  17956  1005 -17958 0
 17954 -17955  17956  1005  17959 0

c  1-1 --> 0
c    (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0 ∧ -p_1005) -> (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧ -b^{67, 16}_0)
c  in CNF:
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_2
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_1
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_0
c  in DIMACS:
 17954  17955 -17956  1005 -17957 0
 17954  17955 -17956  1005 -17958 0
 17954  17955 -17956  1005 -17959 0

c  0-1 --> -1
c    (-b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧ -p_1005) -> ( b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0)
c  in CNF:
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨  b^{67, 16}_2
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_1
c     b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨  b^{67, 16}_0
c  in DIMACS:
 17954  17955  17956  1005  17957 0
 17954  17955  17956  1005 -17958 0
 17954  17955  17956  1005  17959 0

c  -1-1 --> -2
c    ( b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧  b^{67, 15}_0 ∧ -p_1005) -> ( b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0)
c  in CNF:
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨  b^{67, 16}_2
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨  b^{67, 16}_1
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨  p_1005 ∨ -b^{67, 16}_0
c  in DIMACS:
-17954  17955 -17956  1005  17957 0
-17954  17955 -17956  1005  17958 0
-17954  17955 -17956  1005 -17959 0

c  -2-1 --> break 
c    ( b^{67, 15}_2 ∧  b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨  b^{67, 15}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-17954 -17955  17956  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 15}_2 ∧ -b^{67, 15}_1 ∧ -b^{67, 15}_0 ∧ true) 
c  in CNF:
c    -b^{67, 15}_2 ∨  b^{67, 15}_1 ∨  b^{67, 15}_0 ∨ false 
c  in DIMACS:
-17954  17955  17956  0

c  3 does not represent an automaton state.
c    -(-b^{67, 15}_2 ∧  b^{67, 15}_1 ∧  b^{67, 15}_0 ∧ true) 
c  in CNF:
c     b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ false 
c  in DIMACS:
 17954 -17955 -17956  0
c  -3 does not represent an automaton state.
c    -( b^{67, 15}_2 ∧  b^{67, 15}_1 ∧  b^{67, 15}_0 ∧ true) 
c  in CNF:
c    -b^{67, 15}_2 ∨ -b^{67, 15}_1 ∨ -b^{67, 15}_0 ∨ false 
c  in DIMACS:
-17954 -17955 -17956  0

c i = 16
c  -2+1 --> -1
c    ( b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧  p_1072) -> ( b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0)
c  in CNF:
c    -b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨  b^{67, 17}_2
c    -b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_1
c    -b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨  b^{67, 17}_0
c  in DIMACS:
-17957 -17958  17959 -1072  17960 0
-17957 -17958  17959 -1072 -17961 0
-17957 -17958  17959 -1072  17962 0

c  -1+1 --> 0
c    ( b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0 ∧  p_1072) -> (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧ -b^{67, 17}_0)
c  in CNF:
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_2
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_1
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_0
c  in DIMACS:
-17957  17958 -17959 -1072 -17960 0
-17957  17958 -17959 -1072 -17961 0
-17957  17958 -17959 -1072 -17962 0

c  0+1 --> 1
c    (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧  p_1072) -> (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0)
c  in CNF:
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_2
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_1
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨  b^{67, 17}_0
c  in DIMACS:
 17957  17958  17959 -1072 -17960 0
 17957  17958  17959 -1072 -17961 0
 17957  17958  17959 -1072  17962 0

c  1+1 --> 2
c    (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0 ∧  p_1072) -> (-b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0)
c  in CNF:
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_2
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨  b^{67, 17}_1
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ -p_1072 ∨ -b^{67, 17}_0
c  in DIMACS:
 17957  17958 -17959 -1072 -17960 0
 17957  17958 -17959 -1072  17961 0
 17957  17958 -17959 -1072 -17962 0

c  2+1 --> break 
c    (-b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 17957 -17958  17959 -1072 1162 0


c  2-1 --> 1
c    (-b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧ -p_1072) -> (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0)
c  in CNF:
c     b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_2
c     b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_1
c     b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨  b^{67, 17}_0
c  in DIMACS:
 17957 -17958  17959  1072 -17960 0
 17957 -17958  17959  1072 -17961 0
 17957 -17958  17959  1072  17962 0

c  1-1 --> 0
c    (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0 ∧ -p_1072) -> (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧ -b^{67, 17}_0)
c  in CNF:
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_2
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_1
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_0
c  in DIMACS:
 17957  17958 -17959  1072 -17960 0
 17957  17958 -17959  1072 -17961 0
 17957  17958 -17959  1072 -17962 0

c  0-1 --> -1
c    (-b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧ -p_1072) -> ( b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0)
c  in CNF:
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨  b^{67, 17}_2
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_1
c     b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨  b^{67, 17}_0
c  in DIMACS:
 17957  17958  17959  1072  17960 0
 17957  17958  17959  1072 -17961 0
 17957  17958  17959  1072  17962 0

c  -1-1 --> -2
c    ( b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧  b^{67, 16}_0 ∧ -p_1072) -> ( b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0)
c  in CNF:
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨  b^{67, 17}_2
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨  b^{67, 17}_1
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨  p_1072 ∨ -b^{67, 17}_0
c  in DIMACS:
-17957  17958 -17959  1072  17960 0
-17957  17958 -17959  1072  17961 0
-17957  17958 -17959  1072 -17962 0

c  -2-1 --> break 
c    ( b^{67, 16}_2 ∧  b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨  b^{67, 16}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-17957 -17958  17959  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 16}_2 ∧ -b^{67, 16}_1 ∧ -b^{67, 16}_0 ∧ true) 
c  in CNF:
c    -b^{67, 16}_2 ∨  b^{67, 16}_1 ∨  b^{67, 16}_0 ∨ false 
c  in DIMACS:
-17957  17958  17959  0

c  3 does not represent an automaton state.
c    -(-b^{67, 16}_2 ∧  b^{67, 16}_1 ∧  b^{67, 16}_0 ∧ true) 
c  in CNF:
c     b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ false 
c  in DIMACS:
 17957 -17958 -17959  0
c  -3 does not represent an automaton state.
c    -( b^{67, 16}_2 ∧  b^{67, 16}_1 ∧  b^{67, 16}_0 ∧ true) 
c  in CNF:
c    -b^{67, 16}_2 ∨ -b^{67, 16}_1 ∨ -b^{67, 16}_0 ∨ false 
c  in DIMACS:
-17957 -17958 -17959  0

c i = 17
c  -2+1 --> -1
c    ( b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧  p_1139) -> ( b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧  b^{67, 18}_0)
c  in CNF:
c    -b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨  b^{67, 18}_2
c    -b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_1
c    -b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨  b^{67, 18}_0
c  in DIMACS:
-17960 -17961  17962 -1139  17963 0
-17960 -17961  17962 -1139 -17964 0
-17960 -17961  17962 -1139  17965 0

c  -1+1 --> 0
c    ( b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0 ∧  p_1139) -> (-b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧ -b^{67, 18}_0)
c  in CNF:
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_2
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_1
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_0
c  in DIMACS:
-17960  17961 -17962 -1139 -17963 0
-17960  17961 -17962 -1139 -17964 0
-17960  17961 -17962 -1139 -17965 0

c  0+1 --> 1
c    (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧  p_1139) -> (-b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧  b^{67, 18}_0)
c  in CNF:
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_2
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_1
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨  b^{67, 18}_0
c  in DIMACS:
 17960  17961  17962 -1139 -17963 0
 17960  17961  17962 -1139 -17964 0
 17960  17961  17962 -1139  17965 0

c  1+1 --> 2
c    (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0 ∧  p_1139) -> (-b^{67, 18}_2 ∧  b^{67, 18}_1 ∧ -b^{67, 18}_0)
c  in CNF:
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_2
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨  b^{67, 18}_1
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ -p_1139 ∨ -b^{67, 18}_0
c  in DIMACS:
 17960  17961 -17962 -1139 -17963 0
 17960  17961 -17962 -1139  17964 0
 17960  17961 -17962 -1139 -17965 0

c  2+1 --> break 
c    (-b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧  p_1139) -> break
c  in CNF:
c     b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ -p_1139 ∨ break
c  in DIMACS:
 17960 -17961  17962 -1139 1162 0


c  2-1 --> 1
c    (-b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧ -p_1139) -> (-b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧  b^{67, 18}_0)
c  in CNF:
c     b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_2
c     b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_1
c     b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨  b^{67, 18}_0
c  in DIMACS:
 17960 -17961  17962  1139 -17963 0
 17960 -17961  17962  1139 -17964 0
 17960 -17961  17962  1139  17965 0

c  1-1 --> 0
c    (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0 ∧ -p_1139) -> (-b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧ -b^{67, 18}_0)
c  in CNF:
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_2
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_1
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_0
c  in DIMACS:
 17960  17961 -17962  1139 -17963 0
 17960  17961 -17962  1139 -17964 0
 17960  17961 -17962  1139 -17965 0

c  0-1 --> -1
c    (-b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧ -p_1139) -> ( b^{67, 18}_2 ∧ -b^{67, 18}_1 ∧  b^{67, 18}_0)
c  in CNF:
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨  b^{67, 18}_2
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_1
c     b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨  b^{67, 18}_0
c  in DIMACS:
 17960  17961  17962  1139  17963 0
 17960  17961  17962  1139 -17964 0
 17960  17961  17962  1139  17965 0

c  -1-1 --> -2
c    ( b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧  b^{67, 17}_0 ∧ -p_1139) -> ( b^{67, 18}_2 ∧  b^{67, 18}_1 ∧ -b^{67, 18}_0)
c  in CNF:
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨  b^{67, 18}_2
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨  b^{67, 18}_1
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨  p_1139 ∨ -b^{67, 18}_0
c  in DIMACS:
-17960  17961 -17962  1139  17963 0
-17960  17961 -17962  1139  17964 0
-17960  17961 -17962  1139 -17965 0

c  -2-1 --> break 
c    ( b^{67, 17}_2 ∧  b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧ -p_1139) -> break
c  in CNF:
c    -b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨  b^{67, 17}_0 ∨  p_1139 ∨ break
c  in DIMACS:
-17960 -17961  17962  1139 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{67, 17}_2 ∧ -b^{67, 17}_1 ∧ -b^{67, 17}_0 ∧ true) 
c  in CNF:
c    -b^{67, 17}_2 ∨  b^{67, 17}_1 ∨  b^{67, 17}_0 ∨ false 
c  in DIMACS:
-17960  17961  17962  0

c  3 does not represent an automaton state.
c    -(-b^{67, 17}_2 ∧  b^{67, 17}_1 ∧  b^{67, 17}_0 ∧ true) 
c  in CNF:
c     b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ false 
c  in DIMACS:
 17960 -17961 -17962  0
c  -3 does not represent an automaton state.
c    -( b^{67, 17}_2 ∧  b^{67, 17}_1 ∧  b^{67, 17}_0 ∧ true) 
c  in CNF:
c    -b^{67, 17}_2 ∨ -b^{67, 17}_1 ∨ -b^{67, 17}_0 ∨ false 
c  in DIMACS:
-17960 -17961 -17962  0

c INIT for k = 68
c    -b^{68, 1}_2
c    -b^{68, 1}_1
c    -b^{68, 1}_0
c  in DIMACS:
-17966 0
-17967 0
-17968 0

c Transitions for k = 68
c i = 1
c  -2+1 --> -1
c    ( b^{68, 1}_2 ∧  b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧  p_68) -> ( b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0)
c  in CNF:
c    -b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨  b^{68, 2}_2
c    -b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_1
c    -b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨  b^{68, 2}_0
c  in DIMACS:
-17966 -17967  17968 -68  17969 0
-17966 -17967  17968 -68 -17970 0
-17966 -17967  17968 -68  17971 0

c  -1+1 --> 0
c    ( b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧  b^{68, 1}_0 ∧  p_68) -> (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧ -b^{68, 2}_0)
c  in CNF:
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_2
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_1
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_0
c  in DIMACS:
-17966  17967 -17968 -68 -17969 0
-17966  17967 -17968 -68 -17970 0
-17966  17967 -17968 -68 -17971 0

c  0+1 --> 1
c    (-b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧  p_68) -> (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0)
c  in CNF:
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_2
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_1
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨  b^{68, 2}_0
c  in DIMACS:
 17966  17967  17968 -68 -17969 0
 17966  17967  17968 -68 -17970 0
 17966  17967  17968 -68  17971 0

c  1+1 --> 2
c    (-b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧  b^{68, 1}_0 ∧  p_68) -> (-b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0)
c  in CNF:
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_2
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨  b^{68, 2}_1
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ -p_68 ∨ -b^{68, 2}_0
c  in DIMACS:
 17966  17967 -17968 -68 -17969 0
 17966  17967 -17968 -68  17970 0
 17966  17967 -17968 -68 -17971 0

c  2+1 --> break 
c    (-b^{68, 1}_2 ∧  b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧  p_68) -> break
c  in CNF:
c     b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ -p_68 ∨ break
c  in DIMACS:
 17966 -17967  17968 -68 1162 0


c  2-1 --> 1
c    (-b^{68, 1}_2 ∧  b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧ -p_68) -> (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0)
c  in CNF:
c     b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_2
c     b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_1
c     b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨  b^{68, 2}_0
c  in DIMACS:
 17966 -17967  17968  68 -17969 0
 17966 -17967  17968  68 -17970 0
 17966 -17967  17968  68  17971 0

c  1-1 --> 0
c    (-b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧  b^{68, 1}_0 ∧ -p_68) -> (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧ -b^{68, 2}_0)
c  in CNF:
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_2
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_1
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_0
c  in DIMACS:
 17966  17967 -17968  68 -17969 0
 17966  17967 -17968  68 -17970 0
 17966  17967 -17968  68 -17971 0

c  0-1 --> -1
c    (-b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧ -p_68) -> ( b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0)
c  in CNF:
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨  b^{68, 2}_2
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_1
c     b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨  b^{68, 2}_0
c  in DIMACS:
 17966  17967  17968  68  17969 0
 17966  17967  17968  68 -17970 0
 17966  17967  17968  68  17971 0

c  -1-1 --> -2
c    ( b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧  b^{68, 1}_0 ∧ -p_68) -> ( b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0)
c  in CNF:
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨  b^{68, 2}_2
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨  b^{68, 2}_1
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨  p_68 ∨ -b^{68, 2}_0
c  in DIMACS:
-17966  17967 -17968  68  17969 0
-17966  17967 -17968  68  17970 0
-17966  17967 -17968  68 -17971 0

c  -2-1 --> break 
c    ( b^{68, 1}_2 ∧  b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧ -p_68) -> break
c  in CNF:
c    -b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨  b^{68, 1}_0 ∨  p_68 ∨ break
c  in DIMACS:
-17966 -17967  17968  68 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 1}_2 ∧ -b^{68, 1}_1 ∧ -b^{68, 1}_0 ∧ true) 
c  in CNF:
c    -b^{68, 1}_2 ∨  b^{68, 1}_1 ∨  b^{68, 1}_0 ∨ false 
c  in DIMACS:
-17966  17967  17968  0

c  3 does not represent an automaton state.
c    -(-b^{68, 1}_2 ∧  b^{68, 1}_1 ∧  b^{68, 1}_0 ∧ true) 
c  in CNF:
c     b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ false 
c  in DIMACS:
 17966 -17967 -17968  0
c  -3 does not represent an automaton state.
c    -( b^{68, 1}_2 ∧  b^{68, 1}_1 ∧  b^{68, 1}_0 ∧ true) 
c  in CNF:
c    -b^{68, 1}_2 ∨ -b^{68, 1}_1 ∨ -b^{68, 1}_0 ∨ false 
c  in DIMACS:
-17966 -17967 -17968  0

c i = 2
c  -2+1 --> -1
c    ( b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧  p_136) -> ( b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0)
c  in CNF:
c    -b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨  b^{68, 3}_2
c    -b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_1
c    -b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨  b^{68, 3}_0
c  in DIMACS:
-17969 -17970  17971 -136  17972 0
-17969 -17970  17971 -136 -17973 0
-17969 -17970  17971 -136  17974 0

c  -1+1 --> 0
c    ( b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0 ∧  p_136) -> (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧ -b^{68, 3}_0)
c  in CNF:
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_2
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_1
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_0
c  in DIMACS:
-17969  17970 -17971 -136 -17972 0
-17969  17970 -17971 -136 -17973 0
-17969  17970 -17971 -136 -17974 0

c  0+1 --> 1
c    (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧  p_136) -> (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0)
c  in CNF:
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_2
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_1
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨  b^{68, 3}_0
c  in DIMACS:
 17969  17970  17971 -136 -17972 0
 17969  17970  17971 -136 -17973 0
 17969  17970  17971 -136  17974 0

c  1+1 --> 2
c    (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0 ∧  p_136) -> (-b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0)
c  in CNF:
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_2
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨  b^{68, 3}_1
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ -p_136 ∨ -b^{68, 3}_0
c  in DIMACS:
 17969  17970 -17971 -136 -17972 0
 17969  17970 -17971 -136  17973 0
 17969  17970 -17971 -136 -17974 0

c  2+1 --> break 
c    (-b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧  p_136) -> break
c  in CNF:
c     b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 17969 -17970  17971 -136 1162 0


c  2-1 --> 1
c    (-b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧ -p_136) -> (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0)
c  in CNF:
c     b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_2
c     b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_1
c     b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨  b^{68, 3}_0
c  in DIMACS:
 17969 -17970  17971  136 -17972 0
 17969 -17970  17971  136 -17973 0
 17969 -17970  17971  136  17974 0

c  1-1 --> 0
c    (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0 ∧ -p_136) -> (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧ -b^{68, 3}_0)
c  in CNF:
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_2
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_1
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_0
c  in DIMACS:
 17969  17970 -17971  136 -17972 0
 17969  17970 -17971  136 -17973 0
 17969  17970 -17971  136 -17974 0

c  0-1 --> -1
c    (-b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧ -p_136) -> ( b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0)
c  in CNF:
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨  b^{68, 3}_2
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_1
c     b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨  b^{68, 3}_0
c  in DIMACS:
 17969  17970  17971  136  17972 0
 17969  17970  17971  136 -17973 0
 17969  17970  17971  136  17974 0

c  -1-1 --> -2
c    ( b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧  b^{68, 2}_0 ∧ -p_136) -> ( b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0)
c  in CNF:
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨  b^{68, 3}_2
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨  b^{68, 3}_1
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨  p_136 ∨ -b^{68, 3}_0
c  in DIMACS:
-17969  17970 -17971  136  17972 0
-17969  17970 -17971  136  17973 0
-17969  17970 -17971  136 -17974 0

c  -2-1 --> break 
c    ( b^{68, 2}_2 ∧  b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨  b^{68, 2}_0 ∨  p_136 ∨ break
c  in DIMACS:
-17969 -17970  17971  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 2}_2 ∧ -b^{68, 2}_1 ∧ -b^{68, 2}_0 ∧ true) 
c  in CNF:
c    -b^{68, 2}_2 ∨  b^{68, 2}_1 ∨  b^{68, 2}_0 ∨ false 
c  in DIMACS:
-17969  17970  17971  0

c  3 does not represent an automaton state.
c    -(-b^{68, 2}_2 ∧  b^{68, 2}_1 ∧  b^{68, 2}_0 ∧ true) 
c  in CNF:
c     b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ false 
c  in DIMACS:
 17969 -17970 -17971  0
c  -3 does not represent an automaton state.
c    -( b^{68, 2}_2 ∧  b^{68, 2}_1 ∧  b^{68, 2}_0 ∧ true) 
c  in CNF:
c    -b^{68, 2}_2 ∨ -b^{68, 2}_1 ∨ -b^{68, 2}_0 ∨ false 
c  in DIMACS:
-17969 -17970 -17971  0

c i = 3
c  -2+1 --> -1
c    ( b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧  p_204) -> ( b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0)
c  in CNF:
c    -b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨  b^{68, 4}_2
c    -b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_1
c    -b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨  b^{68, 4}_0
c  in DIMACS:
-17972 -17973  17974 -204  17975 0
-17972 -17973  17974 -204 -17976 0
-17972 -17973  17974 -204  17977 0

c  -1+1 --> 0
c    ( b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0 ∧  p_204) -> (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧ -b^{68, 4}_0)
c  in CNF:
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_2
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_1
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_0
c  in DIMACS:
-17972  17973 -17974 -204 -17975 0
-17972  17973 -17974 -204 -17976 0
-17972  17973 -17974 -204 -17977 0

c  0+1 --> 1
c    (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧  p_204) -> (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0)
c  in CNF:
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_2
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_1
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨  b^{68, 4}_0
c  in DIMACS:
 17972  17973  17974 -204 -17975 0
 17972  17973  17974 -204 -17976 0
 17972  17973  17974 -204  17977 0

c  1+1 --> 2
c    (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0 ∧  p_204) -> (-b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0)
c  in CNF:
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_2
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨  b^{68, 4}_1
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ -p_204 ∨ -b^{68, 4}_0
c  in DIMACS:
 17972  17973 -17974 -204 -17975 0
 17972  17973 -17974 -204  17976 0
 17972  17973 -17974 -204 -17977 0

c  2+1 --> break 
c    (-b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧  p_204) -> break
c  in CNF:
c     b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 17972 -17973  17974 -204 1162 0


c  2-1 --> 1
c    (-b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧ -p_204) -> (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0)
c  in CNF:
c     b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_2
c     b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_1
c     b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨  b^{68, 4}_0
c  in DIMACS:
 17972 -17973  17974  204 -17975 0
 17972 -17973  17974  204 -17976 0
 17972 -17973  17974  204  17977 0

c  1-1 --> 0
c    (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0 ∧ -p_204) -> (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧ -b^{68, 4}_0)
c  in CNF:
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_2
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_1
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_0
c  in DIMACS:
 17972  17973 -17974  204 -17975 0
 17972  17973 -17974  204 -17976 0
 17972  17973 -17974  204 -17977 0

c  0-1 --> -1
c    (-b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧ -p_204) -> ( b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0)
c  in CNF:
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨  b^{68, 4}_2
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_1
c     b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨  b^{68, 4}_0
c  in DIMACS:
 17972  17973  17974  204  17975 0
 17972  17973  17974  204 -17976 0
 17972  17973  17974  204  17977 0

c  -1-1 --> -2
c    ( b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧  b^{68, 3}_0 ∧ -p_204) -> ( b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0)
c  in CNF:
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨  b^{68, 4}_2
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨  b^{68, 4}_1
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨  p_204 ∨ -b^{68, 4}_0
c  in DIMACS:
-17972  17973 -17974  204  17975 0
-17972  17973 -17974  204  17976 0
-17972  17973 -17974  204 -17977 0

c  -2-1 --> break 
c    ( b^{68, 3}_2 ∧  b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨  b^{68, 3}_0 ∨  p_204 ∨ break
c  in DIMACS:
-17972 -17973  17974  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 3}_2 ∧ -b^{68, 3}_1 ∧ -b^{68, 3}_0 ∧ true) 
c  in CNF:
c    -b^{68, 3}_2 ∨  b^{68, 3}_1 ∨  b^{68, 3}_0 ∨ false 
c  in DIMACS:
-17972  17973  17974  0

c  3 does not represent an automaton state.
c    -(-b^{68, 3}_2 ∧  b^{68, 3}_1 ∧  b^{68, 3}_0 ∧ true) 
c  in CNF:
c     b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ false 
c  in DIMACS:
 17972 -17973 -17974  0
c  -3 does not represent an automaton state.
c    -( b^{68, 3}_2 ∧  b^{68, 3}_1 ∧  b^{68, 3}_0 ∧ true) 
c  in CNF:
c    -b^{68, 3}_2 ∨ -b^{68, 3}_1 ∨ -b^{68, 3}_0 ∨ false 
c  in DIMACS:
-17972 -17973 -17974  0

c i = 4
c  -2+1 --> -1
c    ( b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧  p_272) -> ( b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0)
c  in CNF:
c    -b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨  b^{68, 5}_2
c    -b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_1
c    -b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨  b^{68, 5}_0
c  in DIMACS:
-17975 -17976  17977 -272  17978 0
-17975 -17976  17977 -272 -17979 0
-17975 -17976  17977 -272  17980 0

c  -1+1 --> 0
c    ( b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0 ∧  p_272) -> (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧ -b^{68, 5}_0)
c  in CNF:
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_2
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_1
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_0
c  in DIMACS:
-17975  17976 -17977 -272 -17978 0
-17975  17976 -17977 -272 -17979 0
-17975  17976 -17977 -272 -17980 0

c  0+1 --> 1
c    (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧  p_272) -> (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0)
c  in CNF:
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_2
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_1
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨  b^{68, 5}_0
c  in DIMACS:
 17975  17976  17977 -272 -17978 0
 17975  17976  17977 -272 -17979 0
 17975  17976  17977 -272  17980 0

c  1+1 --> 2
c    (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0 ∧  p_272) -> (-b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0)
c  in CNF:
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_2
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨  b^{68, 5}_1
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ -p_272 ∨ -b^{68, 5}_0
c  in DIMACS:
 17975  17976 -17977 -272 -17978 0
 17975  17976 -17977 -272  17979 0
 17975  17976 -17977 -272 -17980 0

c  2+1 --> break 
c    (-b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧  p_272) -> break
c  in CNF:
c     b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 17975 -17976  17977 -272 1162 0


c  2-1 --> 1
c    (-b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧ -p_272) -> (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0)
c  in CNF:
c     b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_2
c     b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_1
c     b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨  b^{68, 5}_0
c  in DIMACS:
 17975 -17976  17977  272 -17978 0
 17975 -17976  17977  272 -17979 0
 17975 -17976  17977  272  17980 0

c  1-1 --> 0
c    (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0 ∧ -p_272) -> (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧ -b^{68, 5}_0)
c  in CNF:
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_2
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_1
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_0
c  in DIMACS:
 17975  17976 -17977  272 -17978 0
 17975  17976 -17977  272 -17979 0
 17975  17976 -17977  272 -17980 0

c  0-1 --> -1
c    (-b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧ -p_272) -> ( b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0)
c  in CNF:
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨  b^{68, 5}_2
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_1
c     b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨  b^{68, 5}_0
c  in DIMACS:
 17975  17976  17977  272  17978 0
 17975  17976  17977  272 -17979 0
 17975  17976  17977  272  17980 0

c  -1-1 --> -2
c    ( b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧  b^{68, 4}_0 ∧ -p_272) -> ( b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0)
c  in CNF:
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨  b^{68, 5}_2
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨  b^{68, 5}_1
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨  p_272 ∨ -b^{68, 5}_0
c  in DIMACS:
-17975  17976 -17977  272  17978 0
-17975  17976 -17977  272  17979 0
-17975  17976 -17977  272 -17980 0

c  -2-1 --> break 
c    ( b^{68, 4}_2 ∧  b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨  b^{68, 4}_0 ∨  p_272 ∨ break
c  in DIMACS:
-17975 -17976  17977  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 4}_2 ∧ -b^{68, 4}_1 ∧ -b^{68, 4}_0 ∧ true) 
c  in CNF:
c    -b^{68, 4}_2 ∨  b^{68, 4}_1 ∨  b^{68, 4}_0 ∨ false 
c  in DIMACS:
-17975  17976  17977  0

c  3 does not represent an automaton state.
c    -(-b^{68, 4}_2 ∧  b^{68, 4}_1 ∧  b^{68, 4}_0 ∧ true) 
c  in CNF:
c     b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ false 
c  in DIMACS:
 17975 -17976 -17977  0
c  -3 does not represent an automaton state.
c    -( b^{68, 4}_2 ∧  b^{68, 4}_1 ∧  b^{68, 4}_0 ∧ true) 
c  in CNF:
c    -b^{68, 4}_2 ∨ -b^{68, 4}_1 ∨ -b^{68, 4}_0 ∨ false 
c  in DIMACS:
-17975 -17976 -17977  0

c i = 5
c  -2+1 --> -1
c    ( b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧  p_340) -> ( b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0)
c  in CNF:
c    -b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨  b^{68, 6}_2
c    -b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_1
c    -b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨  b^{68, 6}_0
c  in DIMACS:
-17978 -17979  17980 -340  17981 0
-17978 -17979  17980 -340 -17982 0
-17978 -17979  17980 -340  17983 0

c  -1+1 --> 0
c    ( b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0 ∧  p_340) -> (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧ -b^{68, 6}_0)
c  in CNF:
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_2
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_1
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_0
c  in DIMACS:
-17978  17979 -17980 -340 -17981 0
-17978  17979 -17980 -340 -17982 0
-17978  17979 -17980 -340 -17983 0

c  0+1 --> 1
c    (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧  p_340) -> (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0)
c  in CNF:
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_2
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_1
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨  b^{68, 6}_0
c  in DIMACS:
 17978  17979  17980 -340 -17981 0
 17978  17979  17980 -340 -17982 0
 17978  17979  17980 -340  17983 0

c  1+1 --> 2
c    (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0 ∧  p_340) -> (-b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0)
c  in CNF:
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_2
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨  b^{68, 6}_1
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ -p_340 ∨ -b^{68, 6}_0
c  in DIMACS:
 17978  17979 -17980 -340 -17981 0
 17978  17979 -17980 -340  17982 0
 17978  17979 -17980 -340 -17983 0

c  2+1 --> break 
c    (-b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧  p_340) -> break
c  in CNF:
c     b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 17978 -17979  17980 -340 1162 0


c  2-1 --> 1
c    (-b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧ -p_340) -> (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0)
c  in CNF:
c     b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_2
c     b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_1
c     b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨  b^{68, 6}_0
c  in DIMACS:
 17978 -17979  17980  340 -17981 0
 17978 -17979  17980  340 -17982 0
 17978 -17979  17980  340  17983 0

c  1-1 --> 0
c    (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0 ∧ -p_340) -> (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧ -b^{68, 6}_0)
c  in CNF:
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_2
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_1
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_0
c  in DIMACS:
 17978  17979 -17980  340 -17981 0
 17978  17979 -17980  340 -17982 0
 17978  17979 -17980  340 -17983 0

c  0-1 --> -1
c    (-b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧ -p_340) -> ( b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0)
c  in CNF:
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨  b^{68, 6}_2
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_1
c     b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨  b^{68, 6}_0
c  in DIMACS:
 17978  17979  17980  340  17981 0
 17978  17979  17980  340 -17982 0
 17978  17979  17980  340  17983 0

c  -1-1 --> -2
c    ( b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧  b^{68, 5}_0 ∧ -p_340) -> ( b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0)
c  in CNF:
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨  b^{68, 6}_2
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨  b^{68, 6}_1
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨  p_340 ∨ -b^{68, 6}_0
c  in DIMACS:
-17978  17979 -17980  340  17981 0
-17978  17979 -17980  340  17982 0
-17978  17979 -17980  340 -17983 0

c  -2-1 --> break 
c    ( b^{68, 5}_2 ∧  b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨  b^{68, 5}_0 ∨  p_340 ∨ break
c  in DIMACS:
-17978 -17979  17980  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 5}_2 ∧ -b^{68, 5}_1 ∧ -b^{68, 5}_0 ∧ true) 
c  in CNF:
c    -b^{68, 5}_2 ∨  b^{68, 5}_1 ∨  b^{68, 5}_0 ∨ false 
c  in DIMACS:
-17978  17979  17980  0

c  3 does not represent an automaton state.
c    -(-b^{68, 5}_2 ∧  b^{68, 5}_1 ∧  b^{68, 5}_0 ∧ true) 
c  in CNF:
c     b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ false 
c  in DIMACS:
 17978 -17979 -17980  0
c  -3 does not represent an automaton state.
c    -( b^{68, 5}_2 ∧  b^{68, 5}_1 ∧  b^{68, 5}_0 ∧ true) 
c  in CNF:
c    -b^{68, 5}_2 ∨ -b^{68, 5}_1 ∨ -b^{68, 5}_0 ∨ false 
c  in DIMACS:
-17978 -17979 -17980  0

c i = 6
c  -2+1 --> -1
c    ( b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧  p_408) -> ( b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0)
c  in CNF:
c    -b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨  b^{68, 7}_2
c    -b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_1
c    -b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨  b^{68, 7}_0
c  in DIMACS:
-17981 -17982  17983 -408  17984 0
-17981 -17982  17983 -408 -17985 0
-17981 -17982  17983 -408  17986 0

c  -1+1 --> 0
c    ( b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0 ∧  p_408) -> (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧ -b^{68, 7}_0)
c  in CNF:
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_2
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_1
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_0
c  in DIMACS:
-17981  17982 -17983 -408 -17984 0
-17981  17982 -17983 -408 -17985 0
-17981  17982 -17983 -408 -17986 0

c  0+1 --> 1
c    (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧  p_408) -> (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0)
c  in CNF:
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_2
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_1
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨  b^{68, 7}_0
c  in DIMACS:
 17981  17982  17983 -408 -17984 0
 17981  17982  17983 -408 -17985 0
 17981  17982  17983 -408  17986 0

c  1+1 --> 2
c    (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0 ∧  p_408) -> (-b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0)
c  in CNF:
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_2
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨  b^{68, 7}_1
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ -p_408 ∨ -b^{68, 7}_0
c  in DIMACS:
 17981  17982 -17983 -408 -17984 0
 17981  17982 -17983 -408  17985 0
 17981  17982 -17983 -408 -17986 0

c  2+1 --> break 
c    (-b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧  p_408) -> break
c  in CNF:
c     b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 17981 -17982  17983 -408 1162 0


c  2-1 --> 1
c    (-b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧ -p_408) -> (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0)
c  in CNF:
c     b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_2
c     b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_1
c     b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨  b^{68, 7}_0
c  in DIMACS:
 17981 -17982  17983  408 -17984 0
 17981 -17982  17983  408 -17985 0
 17981 -17982  17983  408  17986 0

c  1-1 --> 0
c    (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0 ∧ -p_408) -> (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧ -b^{68, 7}_0)
c  in CNF:
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_2
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_1
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_0
c  in DIMACS:
 17981  17982 -17983  408 -17984 0
 17981  17982 -17983  408 -17985 0
 17981  17982 -17983  408 -17986 0

c  0-1 --> -1
c    (-b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧ -p_408) -> ( b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0)
c  in CNF:
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨  b^{68, 7}_2
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_1
c     b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨  b^{68, 7}_0
c  in DIMACS:
 17981  17982  17983  408  17984 0
 17981  17982  17983  408 -17985 0
 17981  17982  17983  408  17986 0

c  -1-1 --> -2
c    ( b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧  b^{68, 6}_0 ∧ -p_408) -> ( b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0)
c  in CNF:
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨  b^{68, 7}_2
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨  b^{68, 7}_1
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨  p_408 ∨ -b^{68, 7}_0
c  in DIMACS:
-17981  17982 -17983  408  17984 0
-17981  17982 -17983  408  17985 0
-17981  17982 -17983  408 -17986 0

c  -2-1 --> break 
c    ( b^{68, 6}_2 ∧  b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨  b^{68, 6}_0 ∨  p_408 ∨ break
c  in DIMACS:
-17981 -17982  17983  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 6}_2 ∧ -b^{68, 6}_1 ∧ -b^{68, 6}_0 ∧ true) 
c  in CNF:
c    -b^{68, 6}_2 ∨  b^{68, 6}_1 ∨  b^{68, 6}_0 ∨ false 
c  in DIMACS:
-17981  17982  17983  0

c  3 does not represent an automaton state.
c    -(-b^{68, 6}_2 ∧  b^{68, 6}_1 ∧  b^{68, 6}_0 ∧ true) 
c  in CNF:
c     b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ false 
c  in DIMACS:
 17981 -17982 -17983  0
c  -3 does not represent an automaton state.
c    -( b^{68, 6}_2 ∧  b^{68, 6}_1 ∧  b^{68, 6}_0 ∧ true) 
c  in CNF:
c    -b^{68, 6}_2 ∨ -b^{68, 6}_1 ∨ -b^{68, 6}_0 ∨ false 
c  in DIMACS:
-17981 -17982 -17983  0

c i = 7
c  -2+1 --> -1
c    ( b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧  p_476) -> ( b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0)
c  in CNF:
c    -b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨  b^{68, 8}_2
c    -b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_1
c    -b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨  b^{68, 8}_0
c  in DIMACS:
-17984 -17985  17986 -476  17987 0
-17984 -17985  17986 -476 -17988 0
-17984 -17985  17986 -476  17989 0

c  -1+1 --> 0
c    ( b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0 ∧  p_476) -> (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧ -b^{68, 8}_0)
c  in CNF:
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_2
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_1
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_0
c  in DIMACS:
-17984  17985 -17986 -476 -17987 0
-17984  17985 -17986 -476 -17988 0
-17984  17985 -17986 -476 -17989 0

c  0+1 --> 1
c    (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧  p_476) -> (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0)
c  in CNF:
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_2
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_1
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨  b^{68, 8}_0
c  in DIMACS:
 17984  17985  17986 -476 -17987 0
 17984  17985  17986 -476 -17988 0
 17984  17985  17986 -476  17989 0

c  1+1 --> 2
c    (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0 ∧  p_476) -> (-b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0)
c  in CNF:
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_2
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨  b^{68, 8}_1
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ -p_476 ∨ -b^{68, 8}_0
c  in DIMACS:
 17984  17985 -17986 -476 -17987 0
 17984  17985 -17986 -476  17988 0
 17984  17985 -17986 -476 -17989 0

c  2+1 --> break 
c    (-b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧  p_476) -> break
c  in CNF:
c     b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 17984 -17985  17986 -476 1162 0


c  2-1 --> 1
c    (-b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧ -p_476) -> (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0)
c  in CNF:
c     b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_2
c     b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_1
c     b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨  b^{68, 8}_0
c  in DIMACS:
 17984 -17985  17986  476 -17987 0
 17984 -17985  17986  476 -17988 0
 17984 -17985  17986  476  17989 0

c  1-1 --> 0
c    (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0 ∧ -p_476) -> (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧ -b^{68, 8}_0)
c  in CNF:
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_2
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_1
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_0
c  in DIMACS:
 17984  17985 -17986  476 -17987 0
 17984  17985 -17986  476 -17988 0
 17984  17985 -17986  476 -17989 0

c  0-1 --> -1
c    (-b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧ -p_476) -> ( b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0)
c  in CNF:
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨  b^{68, 8}_2
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_1
c     b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨  b^{68, 8}_0
c  in DIMACS:
 17984  17985  17986  476  17987 0
 17984  17985  17986  476 -17988 0
 17984  17985  17986  476  17989 0

c  -1-1 --> -2
c    ( b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧  b^{68, 7}_0 ∧ -p_476) -> ( b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0)
c  in CNF:
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨  b^{68, 8}_2
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨  b^{68, 8}_1
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨  p_476 ∨ -b^{68, 8}_0
c  in DIMACS:
-17984  17985 -17986  476  17987 0
-17984  17985 -17986  476  17988 0
-17984  17985 -17986  476 -17989 0

c  -2-1 --> break 
c    ( b^{68, 7}_2 ∧  b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨  b^{68, 7}_0 ∨  p_476 ∨ break
c  in DIMACS:
-17984 -17985  17986  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 7}_2 ∧ -b^{68, 7}_1 ∧ -b^{68, 7}_0 ∧ true) 
c  in CNF:
c    -b^{68, 7}_2 ∨  b^{68, 7}_1 ∨  b^{68, 7}_0 ∨ false 
c  in DIMACS:
-17984  17985  17986  0

c  3 does not represent an automaton state.
c    -(-b^{68, 7}_2 ∧  b^{68, 7}_1 ∧  b^{68, 7}_0 ∧ true) 
c  in CNF:
c     b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ false 
c  in DIMACS:
 17984 -17985 -17986  0
c  -3 does not represent an automaton state.
c    -( b^{68, 7}_2 ∧  b^{68, 7}_1 ∧  b^{68, 7}_0 ∧ true) 
c  in CNF:
c    -b^{68, 7}_2 ∨ -b^{68, 7}_1 ∨ -b^{68, 7}_0 ∨ false 
c  in DIMACS:
-17984 -17985 -17986  0

c i = 8
c  -2+1 --> -1
c    ( b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧  p_544) -> ( b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0)
c  in CNF:
c    -b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨  b^{68, 9}_2
c    -b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_1
c    -b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨  b^{68, 9}_0
c  in DIMACS:
-17987 -17988  17989 -544  17990 0
-17987 -17988  17989 -544 -17991 0
-17987 -17988  17989 -544  17992 0

c  -1+1 --> 0
c    ( b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0 ∧  p_544) -> (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧ -b^{68, 9}_0)
c  in CNF:
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_2
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_1
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_0
c  in DIMACS:
-17987  17988 -17989 -544 -17990 0
-17987  17988 -17989 -544 -17991 0
-17987  17988 -17989 -544 -17992 0

c  0+1 --> 1
c    (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧  p_544) -> (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0)
c  in CNF:
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_2
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_1
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨  b^{68, 9}_0
c  in DIMACS:
 17987  17988  17989 -544 -17990 0
 17987  17988  17989 -544 -17991 0
 17987  17988  17989 -544  17992 0

c  1+1 --> 2
c    (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0 ∧  p_544) -> (-b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0)
c  in CNF:
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_2
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨  b^{68, 9}_1
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ -p_544 ∨ -b^{68, 9}_0
c  in DIMACS:
 17987  17988 -17989 -544 -17990 0
 17987  17988 -17989 -544  17991 0
 17987  17988 -17989 -544 -17992 0

c  2+1 --> break 
c    (-b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧  p_544) -> break
c  in CNF:
c     b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 17987 -17988  17989 -544 1162 0


c  2-1 --> 1
c    (-b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧ -p_544) -> (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0)
c  in CNF:
c     b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_2
c     b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_1
c     b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨  b^{68, 9}_0
c  in DIMACS:
 17987 -17988  17989  544 -17990 0
 17987 -17988  17989  544 -17991 0
 17987 -17988  17989  544  17992 0

c  1-1 --> 0
c    (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0 ∧ -p_544) -> (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧ -b^{68, 9}_0)
c  in CNF:
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_2
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_1
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_0
c  in DIMACS:
 17987  17988 -17989  544 -17990 0
 17987  17988 -17989  544 -17991 0
 17987  17988 -17989  544 -17992 0

c  0-1 --> -1
c    (-b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧ -p_544) -> ( b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0)
c  in CNF:
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨  b^{68, 9}_2
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_1
c     b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨  b^{68, 9}_0
c  in DIMACS:
 17987  17988  17989  544  17990 0
 17987  17988  17989  544 -17991 0
 17987  17988  17989  544  17992 0

c  -1-1 --> -2
c    ( b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧  b^{68, 8}_0 ∧ -p_544) -> ( b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0)
c  in CNF:
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨  b^{68, 9}_2
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨  b^{68, 9}_1
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨  p_544 ∨ -b^{68, 9}_0
c  in DIMACS:
-17987  17988 -17989  544  17990 0
-17987  17988 -17989  544  17991 0
-17987  17988 -17989  544 -17992 0

c  -2-1 --> break 
c    ( b^{68, 8}_2 ∧  b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨  b^{68, 8}_0 ∨  p_544 ∨ break
c  in DIMACS:
-17987 -17988  17989  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 8}_2 ∧ -b^{68, 8}_1 ∧ -b^{68, 8}_0 ∧ true) 
c  in CNF:
c    -b^{68, 8}_2 ∨  b^{68, 8}_1 ∨  b^{68, 8}_0 ∨ false 
c  in DIMACS:
-17987  17988  17989  0

c  3 does not represent an automaton state.
c    -(-b^{68, 8}_2 ∧  b^{68, 8}_1 ∧  b^{68, 8}_0 ∧ true) 
c  in CNF:
c     b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ false 
c  in DIMACS:
 17987 -17988 -17989  0
c  -3 does not represent an automaton state.
c    -( b^{68, 8}_2 ∧  b^{68, 8}_1 ∧  b^{68, 8}_0 ∧ true) 
c  in CNF:
c    -b^{68, 8}_2 ∨ -b^{68, 8}_1 ∨ -b^{68, 8}_0 ∨ false 
c  in DIMACS:
-17987 -17988 -17989  0

c i = 9
c  -2+1 --> -1
c    ( b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧  p_612) -> ( b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0)
c  in CNF:
c    -b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨  b^{68, 10}_2
c    -b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_1
c    -b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨  b^{68, 10}_0
c  in DIMACS:
-17990 -17991  17992 -612  17993 0
-17990 -17991  17992 -612 -17994 0
-17990 -17991  17992 -612  17995 0

c  -1+1 --> 0
c    ( b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0 ∧  p_612) -> (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧ -b^{68, 10}_0)
c  in CNF:
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_2
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_1
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_0
c  in DIMACS:
-17990  17991 -17992 -612 -17993 0
-17990  17991 -17992 -612 -17994 0
-17990  17991 -17992 -612 -17995 0

c  0+1 --> 1
c    (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧  p_612) -> (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0)
c  in CNF:
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_2
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_1
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨  b^{68, 10}_0
c  in DIMACS:
 17990  17991  17992 -612 -17993 0
 17990  17991  17992 -612 -17994 0
 17990  17991  17992 -612  17995 0

c  1+1 --> 2
c    (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0 ∧  p_612) -> (-b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0)
c  in CNF:
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_2
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨  b^{68, 10}_1
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ -p_612 ∨ -b^{68, 10}_0
c  in DIMACS:
 17990  17991 -17992 -612 -17993 0
 17990  17991 -17992 -612  17994 0
 17990  17991 -17992 -612 -17995 0

c  2+1 --> break 
c    (-b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧  p_612) -> break
c  in CNF:
c     b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 17990 -17991  17992 -612 1162 0


c  2-1 --> 1
c    (-b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧ -p_612) -> (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0)
c  in CNF:
c     b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_2
c     b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_1
c     b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨  b^{68, 10}_0
c  in DIMACS:
 17990 -17991  17992  612 -17993 0
 17990 -17991  17992  612 -17994 0
 17990 -17991  17992  612  17995 0

c  1-1 --> 0
c    (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0 ∧ -p_612) -> (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧ -b^{68, 10}_0)
c  in CNF:
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_2
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_1
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_0
c  in DIMACS:
 17990  17991 -17992  612 -17993 0
 17990  17991 -17992  612 -17994 0
 17990  17991 -17992  612 -17995 0

c  0-1 --> -1
c    (-b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧ -p_612) -> ( b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0)
c  in CNF:
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨  b^{68, 10}_2
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_1
c     b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨  b^{68, 10}_0
c  in DIMACS:
 17990  17991  17992  612  17993 0
 17990  17991  17992  612 -17994 0
 17990  17991  17992  612  17995 0

c  -1-1 --> -2
c    ( b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧  b^{68, 9}_0 ∧ -p_612) -> ( b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0)
c  in CNF:
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨  b^{68, 10}_2
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨  b^{68, 10}_1
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨  p_612 ∨ -b^{68, 10}_0
c  in DIMACS:
-17990  17991 -17992  612  17993 0
-17990  17991 -17992  612  17994 0
-17990  17991 -17992  612 -17995 0

c  -2-1 --> break 
c    ( b^{68, 9}_2 ∧  b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨  b^{68, 9}_0 ∨  p_612 ∨ break
c  in DIMACS:
-17990 -17991  17992  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 9}_2 ∧ -b^{68, 9}_1 ∧ -b^{68, 9}_0 ∧ true) 
c  in CNF:
c    -b^{68, 9}_2 ∨  b^{68, 9}_1 ∨  b^{68, 9}_0 ∨ false 
c  in DIMACS:
-17990  17991  17992  0

c  3 does not represent an automaton state.
c    -(-b^{68, 9}_2 ∧  b^{68, 9}_1 ∧  b^{68, 9}_0 ∧ true) 
c  in CNF:
c     b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ false 
c  in DIMACS:
 17990 -17991 -17992  0
c  -3 does not represent an automaton state.
c    -( b^{68, 9}_2 ∧  b^{68, 9}_1 ∧  b^{68, 9}_0 ∧ true) 
c  in CNF:
c    -b^{68, 9}_2 ∨ -b^{68, 9}_1 ∨ -b^{68, 9}_0 ∨ false 
c  in DIMACS:
-17990 -17991 -17992  0

c i = 10
c  -2+1 --> -1
c    ( b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧  p_680) -> ( b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0)
c  in CNF:
c    -b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨  b^{68, 11}_2
c    -b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_1
c    -b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨  b^{68, 11}_0
c  in DIMACS:
-17993 -17994  17995 -680  17996 0
-17993 -17994  17995 -680 -17997 0
-17993 -17994  17995 -680  17998 0

c  -1+1 --> 0
c    ( b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0 ∧  p_680) -> (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧ -b^{68, 11}_0)
c  in CNF:
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_2
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_1
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_0
c  in DIMACS:
-17993  17994 -17995 -680 -17996 0
-17993  17994 -17995 -680 -17997 0
-17993  17994 -17995 -680 -17998 0

c  0+1 --> 1
c    (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧  p_680) -> (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0)
c  in CNF:
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_2
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_1
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨  b^{68, 11}_0
c  in DIMACS:
 17993  17994  17995 -680 -17996 0
 17993  17994  17995 -680 -17997 0
 17993  17994  17995 -680  17998 0

c  1+1 --> 2
c    (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0 ∧  p_680) -> (-b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0)
c  in CNF:
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_2
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨  b^{68, 11}_1
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ -p_680 ∨ -b^{68, 11}_0
c  in DIMACS:
 17993  17994 -17995 -680 -17996 0
 17993  17994 -17995 -680  17997 0
 17993  17994 -17995 -680 -17998 0

c  2+1 --> break 
c    (-b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧  p_680) -> break
c  in CNF:
c     b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 17993 -17994  17995 -680 1162 0


c  2-1 --> 1
c    (-b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧ -p_680) -> (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0)
c  in CNF:
c     b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_2
c     b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_1
c     b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨  b^{68, 11}_0
c  in DIMACS:
 17993 -17994  17995  680 -17996 0
 17993 -17994  17995  680 -17997 0
 17993 -17994  17995  680  17998 0

c  1-1 --> 0
c    (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0 ∧ -p_680) -> (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧ -b^{68, 11}_0)
c  in CNF:
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_2
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_1
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_0
c  in DIMACS:
 17993  17994 -17995  680 -17996 0
 17993  17994 -17995  680 -17997 0
 17993  17994 -17995  680 -17998 0

c  0-1 --> -1
c    (-b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧ -p_680) -> ( b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0)
c  in CNF:
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨  b^{68, 11}_2
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_1
c     b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨  b^{68, 11}_0
c  in DIMACS:
 17993  17994  17995  680  17996 0
 17993  17994  17995  680 -17997 0
 17993  17994  17995  680  17998 0

c  -1-1 --> -2
c    ( b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧  b^{68, 10}_0 ∧ -p_680) -> ( b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0)
c  in CNF:
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨  b^{68, 11}_2
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨  b^{68, 11}_1
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨  p_680 ∨ -b^{68, 11}_0
c  in DIMACS:
-17993  17994 -17995  680  17996 0
-17993  17994 -17995  680  17997 0
-17993  17994 -17995  680 -17998 0

c  -2-1 --> break 
c    ( b^{68, 10}_2 ∧  b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨  b^{68, 10}_0 ∨  p_680 ∨ break
c  in DIMACS:
-17993 -17994  17995  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 10}_2 ∧ -b^{68, 10}_1 ∧ -b^{68, 10}_0 ∧ true) 
c  in CNF:
c    -b^{68, 10}_2 ∨  b^{68, 10}_1 ∨  b^{68, 10}_0 ∨ false 
c  in DIMACS:
-17993  17994  17995  0

c  3 does not represent an automaton state.
c    -(-b^{68, 10}_2 ∧  b^{68, 10}_1 ∧  b^{68, 10}_0 ∧ true) 
c  in CNF:
c     b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ false 
c  in DIMACS:
 17993 -17994 -17995  0
c  -3 does not represent an automaton state.
c    -( b^{68, 10}_2 ∧  b^{68, 10}_1 ∧  b^{68, 10}_0 ∧ true) 
c  in CNF:
c    -b^{68, 10}_2 ∨ -b^{68, 10}_1 ∨ -b^{68, 10}_0 ∨ false 
c  in DIMACS:
-17993 -17994 -17995  0

c i = 11
c  -2+1 --> -1
c    ( b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧  p_748) -> ( b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0)
c  in CNF:
c    -b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨  b^{68, 12}_2
c    -b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_1
c    -b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨  b^{68, 12}_0
c  in DIMACS:
-17996 -17997  17998 -748  17999 0
-17996 -17997  17998 -748 -18000 0
-17996 -17997  17998 -748  18001 0

c  -1+1 --> 0
c    ( b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0 ∧  p_748) -> (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧ -b^{68, 12}_0)
c  in CNF:
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_2
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_1
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_0
c  in DIMACS:
-17996  17997 -17998 -748 -17999 0
-17996  17997 -17998 -748 -18000 0
-17996  17997 -17998 -748 -18001 0

c  0+1 --> 1
c    (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧  p_748) -> (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0)
c  in CNF:
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_2
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_1
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨  b^{68, 12}_0
c  in DIMACS:
 17996  17997  17998 -748 -17999 0
 17996  17997  17998 -748 -18000 0
 17996  17997  17998 -748  18001 0

c  1+1 --> 2
c    (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0 ∧  p_748) -> (-b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0)
c  in CNF:
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_2
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨  b^{68, 12}_1
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ -p_748 ∨ -b^{68, 12}_0
c  in DIMACS:
 17996  17997 -17998 -748 -17999 0
 17996  17997 -17998 -748  18000 0
 17996  17997 -17998 -748 -18001 0

c  2+1 --> break 
c    (-b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧  p_748) -> break
c  in CNF:
c     b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 17996 -17997  17998 -748 1162 0


c  2-1 --> 1
c    (-b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧ -p_748) -> (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0)
c  in CNF:
c     b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_2
c     b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_1
c     b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨  b^{68, 12}_0
c  in DIMACS:
 17996 -17997  17998  748 -17999 0
 17996 -17997  17998  748 -18000 0
 17996 -17997  17998  748  18001 0

c  1-1 --> 0
c    (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0 ∧ -p_748) -> (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧ -b^{68, 12}_0)
c  in CNF:
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_2
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_1
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_0
c  in DIMACS:
 17996  17997 -17998  748 -17999 0
 17996  17997 -17998  748 -18000 0
 17996  17997 -17998  748 -18001 0

c  0-1 --> -1
c    (-b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧ -p_748) -> ( b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0)
c  in CNF:
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨  b^{68, 12}_2
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_1
c     b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨  b^{68, 12}_0
c  in DIMACS:
 17996  17997  17998  748  17999 0
 17996  17997  17998  748 -18000 0
 17996  17997  17998  748  18001 0

c  -1-1 --> -2
c    ( b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧  b^{68, 11}_0 ∧ -p_748) -> ( b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0)
c  in CNF:
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨  b^{68, 12}_2
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨  b^{68, 12}_1
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨  p_748 ∨ -b^{68, 12}_0
c  in DIMACS:
-17996  17997 -17998  748  17999 0
-17996  17997 -17998  748  18000 0
-17996  17997 -17998  748 -18001 0

c  -2-1 --> break 
c    ( b^{68, 11}_2 ∧  b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨  b^{68, 11}_0 ∨  p_748 ∨ break
c  in DIMACS:
-17996 -17997  17998  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 11}_2 ∧ -b^{68, 11}_1 ∧ -b^{68, 11}_0 ∧ true) 
c  in CNF:
c    -b^{68, 11}_2 ∨  b^{68, 11}_1 ∨  b^{68, 11}_0 ∨ false 
c  in DIMACS:
-17996  17997  17998  0

c  3 does not represent an automaton state.
c    -(-b^{68, 11}_2 ∧  b^{68, 11}_1 ∧  b^{68, 11}_0 ∧ true) 
c  in CNF:
c     b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ false 
c  in DIMACS:
 17996 -17997 -17998  0
c  -3 does not represent an automaton state.
c    -( b^{68, 11}_2 ∧  b^{68, 11}_1 ∧  b^{68, 11}_0 ∧ true) 
c  in CNF:
c    -b^{68, 11}_2 ∨ -b^{68, 11}_1 ∨ -b^{68, 11}_0 ∨ false 
c  in DIMACS:
-17996 -17997 -17998  0

c i = 12
c  -2+1 --> -1
c    ( b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧  p_816) -> ( b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0)
c  in CNF:
c    -b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨  b^{68, 13}_2
c    -b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_1
c    -b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨  b^{68, 13}_0
c  in DIMACS:
-17999 -18000  18001 -816  18002 0
-17999 -18000  18001 -816 -18003 0
-17999 -18000  18001 -816  18004 0

c  -1+1 --> 0
c    ( b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0 ∧  p_816) -> (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧ -b^{68, 13}_0)
c  in CNF:
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_2
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_1
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_0
c  in DIMACS:
-17999  18000 -18001 -816 -18002 0
-17999  18000 -18001 -816 -18003 0
-17999  18000 -18001 -816 -18004 0

c  0+1 --> 1
c    (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧  p_816) -> (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0)
c  in CNF:
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_2
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_1
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨  b^{68, 13}_0
c  in DIMACS:
 17999  18000  18001 -816 -18002 0
 17999  18000  18001 -816 -18003 0
 17999  18000  18001 -816  18004 0

c  1+1 --> 2
c    (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0 ∧  p_816) -> (-b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0)
c  in CNF:
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_2
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨  b^{68, 13}_1
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ -p_816 ∨ -b^{68, 13}_0
c  in DIMACS:
 17999  18000 -18001 -816 -18002 0
 17999  18000 -18001 -816  18003 0
 17999  18000 -18001 -816 -18004 0

c  2+1 --> break 
c    (-b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧  p_816) -> break
c  in CNF:
c     b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 17999 -18000  18001 -816 1162 0


c  2-1 --> 1
c    (-b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧ -p_816) -> (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0)
c  in CNF:
c     b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_2
c     b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_1
c     b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨  b^{68, 13}_0
c  in DIMACS:
 17999 -18000  18001  816 -18002 0
 17999 -18000  18001  816 -18003 0
 17999 -18000  18001  816  18004 0

c  1-1 --> 0
c    (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0 ∧ -p_816) -> (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧ -b^{68, 13}_0)
c  in CNF:
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_2
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_1
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_0
c  in DIMACS:
 17999  18000 -18001  816 -18002 0
 17999  18000 -18001  816 -18003 0
 17999  18000 -18001  816 -18004 0

c  0-1 --> -1
c    (-b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧ -p_816) -> ( b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0)
c  in CNF:
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨  b^{68, 13}_2
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_1
c     b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨  b^{68, 13}_0
c  in DIMACS:
 17999  18000  18001  816  18002 0
 17999  18000  18001  816 -18003 0
 17999  18000  18001  816  18004 0

c  -1-1 --> -2
c    ( b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧  b^{68, 12}_0 ∧ -p_816) -> ( b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0)
c  in CNF:
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨  b^{68, 13}_2
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨  b^{68, 13}_1
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨  p_816 ∨ -b^{68, 13}_0
c  in DIMACS:
-17999  18000 -18001  816  18002 0
-17999  18000 -18001  816  18003 0
-17999  18000 -18001  816 -18004 0

c  -2-1 --> break 
c    ( b^{68, 12}_2 ∧  b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨  b^{68, 12}_0 ∨  p_816 ∨ break
c  in DIMACS:
-17999 -18000  18001  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 12}_2 ∧ -b^{68, 12}_1 ∧ -b^{68, 12}_0 ∧ true) 
c  in CNF:
c    -b^{68, 12}_2 ∨  b^{68, 12}_1 ∨  b^{68, 12}_0 ∨ false 
c  in DIMACS:
-17999  18000  18001  0

c  3 does not represent an automaton state.
c    -(-b^{68, 12}_2 ∧  b^{68, 12}_1 ∧  b^{68, 12}_0 ∧ true) 
c  in CNF:
c     b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ false 
c  in DIMACS:
 17999 -18000 -18001  0
c  -3 does not represent an automaton state.
c    -( b^{68, 12}_2 ∧  b^{68, 12}_1 ∧  b^{68, 12}_0 ∧ true) 
c  in CNF:
c    -b^{68, 12}_2 ∨ -b^{68, 12}_1 ∨ -b^{68, 12}_0 ∨ false 
c  in DIMACS:
-17999 -18000 -18001  0

c i = 13
c  -2+1 --> -1
c    ( b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧  p_884) -> ( b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0)
c  in CNF:
c    -b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨  b^{68, 14}_2
c    -b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_1
c    -b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨  b^{68, 14}_0
c  in DIMACS:
-18002 -18003  18004 -884  18005 0
-18002 -18003  18004 -884 -18006 0
-18002 -18003  18004 -884  18007 0

c  -1+1 --> 0
c    ( b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0 ∧  p_884) -> (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧ -b^{68, 14}_0)
c  in CNF:
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_2
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_1
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_0
c  in DIMACS:
-18002  18003 -18004 -884 -18005 0
-18002  18003 -18004 -884 -18006 0
-18002  18003 -18004 -884 -18007 0

c  0+1 --> 1
c    (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧  p_884) -> (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0)
c  in CNF:
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_2
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_1
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨  b^{68, 14}_0
c  in DIMACS:
 18002  18003  18004 -884 -18005 0
 18002  18003  18004 -884 -18006 0
 18002  18003  18004 -884  18007 0

c  1+1 --> 2
c    (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0 ∧  p_884) -> (-b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0)
c  in CNF:
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_2
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨  b^{68, 14}_1
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ -p_884 ∨ -b^{68, 14}_0
c  in DIMACS:
 18002  18003 -18004 -884 -18005 0
 18002  18003 -18004 -884  18006 0
 18002  18003 -18004 -884 -18007 0

c  2+1 --> break 
c    (-b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧  p_884) -> break
c  in CNF:
c     b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 18002 -18003  18004 -884 1162 0


c  2-1 --> 1
c    (-b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧ -p_884) -> (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0)
c  in CNF:
c     b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_2
c     b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_1
c     b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨  b^{68, 14}_0
c  in DIMACS:
 18002 -18003  18004  884 -18005 0
 18002 -18003  18004  884 -18006 0
 18002 -18003  18004  884  18007 0

c  1-1 --> 0
c    (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0 ∧ -p_884) -> (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧ -b^{68, 14}_0)
c  in CNF:
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_2
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_1
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_0
c  in DIMACS:
 18002  18003 -18004  884 -18005 0
 18002  18003 -18004  884 -18006 0
 18002  18003 -18004  884 -18007 0

c  0-1 --> -1
c    (-b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧ -p_884) -> ( b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0)
c  in CNF:
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨  b^{68, 14}_2
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_1
c     b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨  b^{68, 14}_0
c  in DIMACS:
 18002  18003  18004  884  18005 0
 18002  18003  18004  884 -18006 0
 18002  18003  18004  884  18007 0

c  -1-1 --> -2
c    ( b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧  b^{68, 13}_0 ∧ -p_884) -> ( b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0)
c  in CNF:
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨  b^{68, 14}_2
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨  b^{68, 14}_1
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨  p_884 ∨ -b^{68, 14}_0
c  in DIMACS:
-18002  18003 -18004  884  18005 0
-18002  18003 -18004  884  18006 0
-18002  18003 -18004  884 -18007 0

c  -2-1 --> break 
c    ( b^{68, 13}_2 ∧  b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨  b^{68, 13}_0 ∨  p_884 ∨ break
c  in DIMACS:
-18002 -18003  18004  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 13}_2 ∧ -b^{68, 13}_1 ∧ -b^{68, 13}_0 ∧ true) 
c  in CNF:
c    -b^{68, 13}_2 ∨  b^{68, 13}_1 ∨  b^{68, 13}_0 ∨ false 
c  in DIMACS:
-18002  18003  18004  0

c  3 does not represent an automaton state.
c    -(-b^{68, 13}_2 ∧  b^{68, 13}_1 ∧  b^{68, 13}_0 ∧ true) 
c  in CNF:
c     b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ false 
c  in DIMACS:
 18002 -18003 -18004  0
c  -3 does not represent an automaton state.
c    -( b^{68, 13}_2 ∧  b^{68, 13}_1 ∧  b^{68, 13}_0 ∧ true) 
c  in CNF:
c    -b^{68, 13}_2 ∨ -b^{68, 13}_1 ∨ -b^{68, 13}_0 ∨ false 
c  in DIMACS:
-18002 -18003 -18004  0

c i = 14
c  -2+1 --> -1
c    ( b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧  p_952) -> ( b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0)
c  in CNF:
c    -b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨  b^{68, 15}_2
c    -b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_1
c    -b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨  b^{68, 15}_0
c  in DIMACS:
-18005 -18006  18007 -952  18008 0
-18005 -18006  18007 -952 -18009 0
-18005 -18006  18007 -952  18010 0

c  -1+1 --> 0
c    ( b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0 ∧  p_952) -> (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧ -b^{68, 15}_0)
c  in CNF:
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_2
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_1
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_0
c  in DIMACS:
-18005  18006 -18007 -952 -18008 0
-18005  18006 -18007 -952 -18009 0
-18005  18006 -18007 -952 -18010 0

c  0+1 --> 1
c    (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧  p_952) -> (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0)
c  in CNF:
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_2
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_1
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨  b^{68, 15}_0
c  in DIMACS:
 18005  18006  18007 -952 -18008 0
 18005  18006  18007 -952 -18009 0
 18005  18006  18007 -952  18010 0

c  1+1 --> 2
c    (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0 ∧  p_952) -> (-b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0)
c  in CNF:
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_2
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨  b^{68, 15}_1
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ -p_952 ∨ -b^{68, 15}_0
c  in DIMACS:
 18005  18006 -18007 -952 -18008 0
 18005  18006 -18007 -952  18009 0
 18005  18006 -18007 -952 -18010 0

c  2+1 --> break 
c    (-b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧  p_952) -> break
c  in CNF:
c     b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 18005 -18006  18007 -952 1162 0


c  2-1 --> 1
c    (-b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧ -p_952) -> (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0)
c  in CNF:
c     b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_2
c     b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_1
c     b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨  b^{68, 15}_0
c  in DIMACS:
 18005 -18006  18007  952 -18008 0
 18005 -18006  18007  952 -18009 0
 18005 -18006  18007  952  18010 0

c  1-1 --> 0
c    (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0 ∧ -p_952) -> (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧ -b^{68, 15}_0)
c  in CNF:
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_2
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_1
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_0
c  in DIMACS:
 18005  18006 -18007  952 -18008 0
 18005  18006 -18007  952 -18009 0
 18005  18006 -18007  952 -18010 0

c  0-1 --> -1
c    (-b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧ -p_952) -> ( b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0)
c  in CNF:
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨  b^{68, 15}_2
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_1
c     b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨  b^{68, 15}_0
c  in DIMACS:
 18005  18006  18007  952  18008 0
 18005  18006  18007  952 -18009 0
 18005  18006  18007  952  18010 0

c  -1-1 --> -2
c    ( b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧  b^{68, 14}_0 ∧ -p_952) -> ( b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0)
c  in CNF:
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨  b^{68, 15}_2
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨  b^{68, 15}_1
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨  p_952 ∨ -b^{68, 15}_0
c  in DIMACS:
-18005  18006 -18007  952  18008 0
-18005  18006 -18007  952  18009 0
-18005  18006 -18007  952 -18010 0

c  -2-1 --> break 
c    ( b^{68, 14}_2 ∧  b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨  b^{68, 14}_0 ∨  p_952 ∨ break
c  in DIMACS:
-18005 -18006  18007  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 14}_2 ∧ -b^{68, 14}_1 ∧ -b^{68, 14}_0 ∧ true) 
c  in CNF:
c    -b^{68, 14}_2 ∨  b^{68, 14}_1 ∨  b^{68, 14}_0 ∨ false 
c  in DIMACS:
-18005  18006  18007  0

c  3 does not represent an automaton state.
c    -(-b^{68, 14}_2 ∧  b^{68, 14}_1 ∧  b^{68, 14}_0 ∧ true) 
c  in CNF:
c     b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ false 
c  in DIMACS:
 18005 -18006 -18007  0
c  -3 does not represent an automaton state.
c    -( b^{68, 14}_2 ∧  b^{68, 14}_1 ∧  b^{68, 14}_0 ∧ true) 
c  in CNF:
c    -b^{68, 14}_2 ∨ -b^{68, 14}_1 ∨ -b^{68, 14}_0 ∨ false 
c  in DIMACS:
-18005 -18006 -18007  0

c i = 15
c  -2+1 --> -1
c    ( b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧  p_1020) -> ( b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0)
c  in CNF:
c    -b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨  b^{68, 16}_2
c    -b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_1
c    -b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨  b^{68, 16}_0
c  in DIMACS:
-18008 -18009  18010 -1020  18011 0
-18008 -18009  18010 -1020 -18012 0
-18008 -18009  18010 -1020  18013 0

c  -1+1 --> 0
c    ( b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0 ∧  p_1020) -> (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧ -b^{68, 16}_0)
c  in CNF:
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_2
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_1
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_0
c  in DIMACS:
-18008  18009 -18010 -1020 -18011 0
-18008  18009 -18010 -1020 -18012 0
-18008  18009 -18010 -1020 -18013 0

c  0+1 --> 1
c    (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧  p_1020) -> (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0)
c  in CNF:
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_2
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_1
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨  b^{68, 16}_0
c  in DIMACS:
 18008  18009  18010 -1020 -18011 0
 18008  18009  18010 -1020 -18012 0
 18008  18009  18010 -1020  18013 0

c  1+1 --> 2
c    (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0 ∧  p_1020) -> (-b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0)
c  in CNF:
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_2
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨  b^{68, 16}_1
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ -p_1020 ∨ -b^{68, 16}_0
c  in DIMACS:
 18008  18009 -18010 -1020 -18011 0
 18008  18009 -18010 -1020  18012 0
 18008  18009 -18010 -1020 -18013 0

c  2+1 --> break 
c    (-b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 18008 -18009  18010 -1020 1162 0


c  2-1 --> 1
c    (-b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧ -p_1020) -> (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0)
c  in CNF:
c     b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_2
c     b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_1
c     b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨  b^{68, 16}_0
c  in DIMACS:
 18008 -18009  18010  1020 -18011 0
 18008 -18009  18010  1020 -18012 0
 18008 -18009  18010  1020  18013 0

c  1-1 --> 0
c    (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0 ∧ -p_1020) -> (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧ -b^{68, 16}_0)
c  in CNF:
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_2
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_1
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_0
c  in DIMACS:
 18008  18009 -18010  1020 -18011 0
 18008  18009 -18010  1020 -18012 0
 18008  18009 -18010  1020 -18013 0

c  0-1 --> -1
c    (-b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧ -p_1020) -> ( b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0)
c  in CNF:
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨  b^{68, 16}_2
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_1
c     b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨  b^{68, 16}_0
c  in DIMACS:
 18008  18009  18010  1020  18011 0
 18008  18009  18010  1020 -18012 0
 18008  18009  18010  1020  18013 0

c  -1-1 --> -2
c    ( b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧  b^{68, 15}_0 ∧ -p_1020) -> ( b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0)
c  in CNF:
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨  b^{68, 16}_2
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨  b^{68, 16}_1
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨  p_1020 ∨ -b^{68, 16}_0
c  in DIMACS:
-18008  18009 -18010  1020  18011 0
-18008  18009 -18010  1020  18012 0
-18008  18009 -18010  1020 -18013 0

c  -2-1 --> break 
c    ( b^{68, 15}_2 ∧  b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨  b^{68, 15}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-18008 -18009  18010  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 15}_2 ∧ -b^{68, 15}_1 ∧ -b^{68, 15}_0 ∧ true) 
c  in CNF:
c    -b^{68, 15}_2 ∨  b^{68, 15}_1 ∨  b^{68, 15}_0 ∨ false 
c  in DIMACS:
-18008  18009  18010  0

c  3 does not represent an automaton state.
c    -(-b^{68, 15}_2 ∧  b^{68, 15}_1 ∧  b^{68, 15}_0 ∧ true) 
c  in CNF:
c     b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ false 
c  in DIMACS:
 18008 -18009 -18010  0
c  -3 does not represent an automaton state.
c    -( b^{68, 15}_2 ∧  b^{68, 15}_1 ∧  b^{68, 15}_0 ∧ true) 
c  in CNF:
c    -b^{68, 15}_2 ∨ -b^{68, 15}_1 ∨ -b^{68, 15}_0 ∨ false 
c  in DIMACS:
-18008 -18009 -18010  0

c i = 16
c  -2+1 --> -1
c    ( b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧  p_1088) -> ( b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0)
c  in CNF:
c    -b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨  b^{68, 17}_2
c    -b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_1
c    -b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨  b^{68, 17}_0
c  in DIMACS:
-18011 -18012  18013 -1088  18014 0
-18011 -18012  18013 -1088 -18015 0
-18011 -18012  18013 -1088  18016 0

c  -1+1 --> 0
c    ( b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0 ∧  p_1088) -> (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧ -b^{68, 17}_0)
c  in CNF:
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_2
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_1
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_0
c  in DIMACS:
-18011  18012 -18013 -1088 -18014 0
-18011  18012 -18013 -1088 -18015 0
-18011  18012 -18013 -1088 -18016 0

c  0+1 --> 1
c    (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧  p_1088) -> (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0)
c  in CNF:
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_2
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_1
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨  b^{68, 17}_0
c  in DIMACS:
 18011  18012  18013 -1088 -18014 0
 18011  18012  18013 -1088 -18015 0
 18011  18012  18013 -1088  18016 0

c  1+1 --> 2
c    (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0 ∧  p_1088) -> (-b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0)
c  in CNF:
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_2
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨  b^{68, 17}_1
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ -p_1088 ∨ -b^{68, 17}_0
c  in DIMACS:
 18011  18012 -18013 -1088 -18014 0
 18011  18012 -18013 -1088  18015 0
 18011  18012 -18013 -1088 -18016 0

c  2+1 --> break 
c    (-b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 18011 -18012  18013 -1088 1162 0


c  2-1 --> 1
c    (-b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧ -p_1088) -> (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0)
c  in CNF:
c     b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_2
c     b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_1
c     b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨  b^{68, 17}_0
c  in DIMACS:
 18011 -18012  18013  1088 -18014 0
 18011 -18012  18013  1088 -18015 0
 18011 -18012  18013  1088  18016 0

c  1-1 --> 0
c    (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0 ∧ -p_1088) -> (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧ -b^{68, 17}_0)
c  in CNF:
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_2
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_1
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_0
c  in DIMACS:
 18011  18012 -18013  1088 -18014 0
 18011  18012 -18013  1088 -18015 0
 18011  18012 -18013  1088 -18016 0

c  0-1 --> -1
c    (-b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧ -p_1088) -> ( b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0)
c  in CNF:
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨  b^{68, 17}_2
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_1
c     b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨  b^{68, 17}_0
c  in DIMACS:
 18011  18012  18013  1088  18014 0
 18011  18012  18013  1088 -18015 0
 18011  18012  18013  1088  18016 0

c  -1-1 --> -2
c    ( b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧  b^{68, 16}_0 ∧ -p_1088) -> ( b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0)
c  in CNF:
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨  b^{68, 17}_2
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨  b^{68, 17}_1
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨  p_1088 ∨ -b^{68, 17}_0
c  in DIMACS:
-18011  18012 -18013  1088  18014 0
-18011  18012 -18013  1088  18015 0
-18011  18012 -18013  1088 -18016 0

c  -2-1 --> break 
c    ( b^{68, 16}_2 ∧  b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨  b^{68, 16}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-18011 -18012  18013  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 16}_2 ∧ -b^{68, 16}_1 ∧ -b^{68, 16}_0 ∧ true) 
c  in CNF:
c    -b^{68, 16}_2 ∨  b^{68, 16}_1 ∨  b^{68, 16}_0 ∨ false 
c  in DIMACS:
-18011  18012  18013  0

c  3 does not represent an automaton state.
c    -(-b^{68, 16}_2 ∧  b^{68, 16}_1 ∧  b^{68, 16}_0 ∧ true) 
c  in CNF:
c     b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ false 
c  in DIMACS:
 18011 -18012 -18013  0
c  -3 does not represent an automaton state.
c    -( b^{68, 16}_2 ∧  b^{68, 16}_1 ∧  b^{68, 16}_0 ∧ true) 
c  in CNF:
c    -b^{68, 16}_2 ∨ -b^{68, 16}_1 ∨ -b^{68, 16}_0 ∨ false 
c  in DIMACS:
-18011 -18012 -18013  0

c i = 17
c  -2+1 --> -1
c    ( b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧  p_1156) -> ( b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧  b^{68, 18}_0)
c  in CNF:
c    -b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨  b^{68, 18}_2
c    -b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_1
c    -b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨  b^{68, 18}_0
c  in DIMACS:
-18014 -18015  18016 -1156  18017 0
-18014 -18015  18016 -1156 -18018 0
-18014 -18015  18016 -1156  18019 0

c  -1+1 --> 0
c    ( b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0 ∧  p_1156) -> (-b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧ -b^{68, 18}_0)
c  in CNF:
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_2
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_1
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_0
c  in DIMACS:
-18014  18015 -18016 -1156 -18017 0
-18014  18015 -18016 -1156 -18018 0
-18014  18015 -18016 -1156 -18019 0

c  0+1 --> 1
c    (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧  p_1156) -> (-b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧  b^{68, 18}_0)
c  in CNF:
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_2
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_1
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨  b^{68, 18}_0
c  in DIMACS:
 18014  18015  18016 -1156 -18017 0
 18014  18015  18016 -1156 -18018 0
 18014  18015  18016 -1156  18019 0

c  1+1 --> 2
c    (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0 ∧  p_1156) -> (-b^{68, 18}_2 ∧  b^{68, 18}_1 ∧ -b^{68, 18}_0)
c  in CNF:
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_2
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨  b^{68, 18}_1
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ -p_1156 ∨ -b^{68, 18}_0
c  in DIMACS:
 18014  18015 -18016 -1156 -18017 0
 18014  18015 -18016 -1156  18018 0
 18014  18015 -18016 -1156 -18019 0

c  2+1 --> break 
c    (-b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 18014 -18015  18016 -1156 1162 0


c  2-1 --> 1
c    (-b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧ -p_1156) -> (-b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧  b^{68, 18}_0)
c  in CNF:
c     b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_2
c     b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_1
c     b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨  b^{68, 18}_0
c  in DIMACS:
 18014 -18015  18016  1156 -18017 0
 18014 -18015  18016  1156 -18018 0
 18014 -18015  18016  1156  18019 0

c  1-1 --> 0
c    (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0 ∧ -p_1156) -> (-b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧ -b^{68, 18}_0)
c  in CNF:
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_2
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_1
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_0
c  in DIMACS:
 18014  18015 -18016  1156 -18017 0
 18014  18015 -18016  1156 -18018 0
 18014  18015 -18016  1156 -18019 0

c  0-1 --> -1
c    (-b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧ -p_1156) -> ( b^{68, 18}_2 ∧ -b^{68, 18}_1 ∧  b^{68, 18}_0)
c  in CNF:
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨  b^{68, 18}_2
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_1
c     b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨  b^{68, 18}_0
c  in DIMACS:
 18014  18015  18016  1156  18017 0
 18014  18015  18016  1156 -18018 0
 18014  18015  18016  1156  18019 0

c  -1-1 --> -2
c    ( b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧  b^{68, 17}_0 ∧ -p_1156) -> ( b^{68, 18}_2 ∧  b^{68, 18}_1 ∧ -b^{68, 18}_0)
c  in CNF:
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨  b^{68, 18}_2
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨  b^{68, 18}_1
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨  p_1156 ∨ -b^{68, 18}_0
c  in DIMACS:
-18014  18015 -18016  1156  18017 0
-18014  18015 -18016  1156  18018 0
-18014  18015 -18016  1156 -18019 0

c  -2-1 --> break 
c    ( b^{68, 17}_2 ∧  b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨  b^{68, 17}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-18014 -18015  18016  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{68, 17}_2 ∧ -b^{68, 17}_1 ∧ -b^{68, 17}_0 ∧ true) 
c  in CNF:
c    -b^{68, 17}_2 ∨  b^{68, 17}_1 ∨  b^{68, 17}_0 ∨ false 
c  in DIMACS:
-18014  18015  18016  0

c  3 does not represent an automaton state.
c    -(-b^{68, 17}_2 ∧  b^{68, 17}_1 ∧  b^{68, 17}_0 ∧ true) 
c  in CNF:
c     b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ false 
c  in DIMACS:
 18014 -18015 -18016  0
c  -3 does not represent an automaton state.
c    -( b^{68, 17}_2 ∧  b^{68, 17}_1 ∧  b^{68, 17}_0 ∧ true) 
c  in CNF:
c    -b^{68, 17}_2 ∨ -b^{68, 17}_1 ∨ -b^{68, 17}_0 ∨ false 
c  in DIMACS:
-18014 -18015 -18016  0

c INIT for k = 69
c    -b^{69, 1}_2
c    -b^{69, 1}_1
c    -b^{69, 1}_0
c  in DIMACS:
-18020 0
-18021 0
-18022 0

c Transitions for k = 69
c i = 1
c  -2+1 --> -1
c    ( b^{69, 1}_2 ∧  b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧  p_69) -> ( b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0)
c  in CNF:
c    -b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨  b^{69, 2}_2
c    -b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_1
c    -b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨  b^{69, 2}_0
c  in DIMACS:
-18020 -18021  18022 -69  18023 0
-18020 -18021  18022 -69 -18024 0
-18020 -18021  18022 -69  18025 0

c  -1+1 --> 0
c    ( b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧  b^{69, 1}_0 ∧  p_69) -> (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧ -b^{69, 2}_0)
c  in CNF:
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_2
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_1
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_0
c  in DIMACS:
-18020  18021 -18022 -69 -18023 0
-18020  18021 -18022 -69 -18024 0
-18020  18021 -18022 -69 -18025 0

c  0+1 --> 1
c    (-b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧  p_69) -> (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0)
c  in CNF:
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_2
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_1
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨  b^{69, 2}_0
c  in DIMACS:
 18020  18021  18022 -69 -18023 0
 18020  18021  18022 -69 -18024 0
 18020  18021  18022 -69  18025 0

c  1+1 --> 2
c    (-b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧  b^{69, 1}_0 ∧  p_69) -> (-b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0)
c  in CNF:
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_2
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨  b^{69, 2}_1
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ -p_69 ∨ -b^{69, 2}_0
c  in DIMACS:
 18020  18021 -18022 -69 -18023 0
 18020  18021 -18022 -69  18024 0
 18020  18021 -18022 -69 -18025 0

c  2+1 --> break 
c    (-b^{69, 1}_2 ∧  b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧  p_69) -> break
c  in CNF:
c     b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ -p_69 ∨ break
c  in DIMACS:
 18020 -18021  18022 -69 1162 0


c  2-1 --> 1
c    (-b^{69, 1}_2 ∧  b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧ -p_69) -> (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0)
c  in CNF:
c     b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_2
c     b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_1
c     b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨  b^{69, 2}_0
c  in DIMACS:
 18020 -18021  18022  69 -18023 0
 18020 -18021  18022  69 -18024 0
 18020 -18021  18022  69  18025 0

c  1-1 --> 0
c    (-b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧  b^{69, 1}_0 ∧ -p_69) -> (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧ -b^{69, 2}_0)
c  in CNF:
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_2
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_1
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_0
c  in DIMACS:
 18020  18021 -18022  69 -18023 0
 18020  18021 -18022  69 -18024 0
 18020  18021 -18022  69 -18025 0

c  0-1 --> -1
c    (-b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧ -p_69) -> ( b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0)
c  in CNF:
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨  b^{69, 2}_2
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_1
c     b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨  b^{69, 2}_0
c  in DIMACS:
 18020  18021  18022  69  18023 0
 18020  18021  18022  69 -18024 0
 18020  18021  18022  69  18025 0

c  -1-1 --> -2
c    ( b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧  b^{69, 1}_0 ∧ -p_69) -> ( b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0)
c  in CNF:
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨  b^{69, 2}_2
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨  b^{69, 2}_1
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨  p_69 ∨ -b^{69, 2}_0
c  in DIMACS:
-18020  18021 -18022  69  18023 0
-18020  18021 -18022  69  18024 0
-18020  18021 -18022  69 -18025 0

c  -2-1 --> break 
c    ( b^{69, 1}_2 ∧  b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧ -p_69) -> break
c  in CNF:
c    -b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨  b^{69, 1}_0 ∨  p_69 ∨ break
c  in DIMACS:
-18020 -18021  18022  69 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 1}_2 ∧ -b^{69, 1}_1 ∧ -b^{69, 1}_0 ∧ true) 
c  in CNF:
c    -b^{69, 1}_2 ∨  b^{69, 1}_1 ∨  b^{69, 1}_0 ∨ false 
c  in DIMACS:
-18020  18021  18022  0

c  3 does not represent an automaton state.
c    -(-b^{69, 1}_2 ∧  b^{69, 1}_1 ∧  b^{69, 1}_0 ∧ true) 
c  in CNF:
c     b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ false 
c  in DIMACS:
 18020 -18021 -18022  0
c  -3 does not represent an automaton state.
c    -( b^{69, 1}_2 ∧  b^{69, 1}_1 ∧  b^{69, 1}_0 ∧ true) 
c  in CNF:
c    -b^{69, 1}_2 ∨ -b^{69, 1}_1 ∨ -b^{69, 1}_0 ∨ false 
c  in DIMACS:
-18020 -18021 -18022  0

c i = 2
c  -2+1 --> -1
c    ( b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧  p_138) -> ( b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0)
c  in CNF:
c    -b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨  b^{69, 3}_2
c    -b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_1
c    -b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨  b^{69, 3}_0
c  in DIMACS:
-18023 -18024  18025 -138  18026 0
-18023 -18024  18025 -138 -18027 0
-18023 -18024  18025 -138  18028 0

c  -1+1 --> 0
c    ( b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0 ∧  p_138) -> (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧ -b^{69, 3}_0)
c  in CNF:
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_2
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_1
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_0
c  in DIMACS:
-18023  18024 -18025 -138 -18026 0
-18023  18024 -18025 -138 -18027 0
-18023  18024 -18025 -138 -18028 0

c  0+1 --> 1
c    (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧  p_138) -> (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0)
c  in CNF:
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_2
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_1
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨  b^{69, 3}_0
c  in DIMACS:
 18023  18024  18025 -138 -18026 0
 18023  18024  18025 -138 -18027 0
 18023  18024  18025 -138  18028 0

c  1+1 --> 2
c    (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0 ∧  p_138) -> (-b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0)
c  in CNF:
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_2
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨  b^{69, 3}_1
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ -p_138 ∨ -b^{69, 3}_0
c  in DIMACS:
 18023  18024 -18025 -138 -18026 0
 18023  18024 -18025 -138  18027 0
 18023  18024 -18025 -138 -18028 0

c  2+1 --> break 
c    (-b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧  p_138) -> break
c  in CNF:
c     b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 18023 -18024  18025 -138 1162 0


c  2-1 --> 1
c    (-b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧ -p_138) -> (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0)
c  in CNF:
c     b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_2
c     b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_1
c     b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨  b^{69, 3}_0
c  in DIMACS:
 18023 -18024  18025  138 -18026 0
 18023 -18024  18025  138 -18027 0
 18023 -18024  18025  138  18028 0

c  1-1 --> 0
c    (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0 ∧ -p_138) -> (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧ -b^{69, 3}_0)
c  in CNF:
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_2
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_1
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_0
c  in DIMACS:
 18023  18024 -18025  138 -18026 0
 18023  18024 -18025  138 -18027 0
 18023  18024 -18025  138 -18028 0

c  0-1 --> -1
c    (-b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧ -p_138) -> ( b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0)
c  in CNF:
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨  b^{69, 3}_2
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_1
c     b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨  b^{69, 3}_0
c  in DIMACS:
 18023  18024  18025  138  18026 0
 18023  18024  18025  138 -18027 0
 18023  18024  18025  138  18028 0

c  -1-1 --> -2
c    ( b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧  b^{69, 2}_0 ∧ -p_138) -> ( b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0)
c  in CNF:
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨  b^{69, 3}_2
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨  b^{69, 3}_1
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨  p_138 ∨ -b^{69, 3}_0
c  in DIMACS:
-18023  18024 -18025  138  18026 0
-18023  18024 -18025  138  18027 0
-18023  18024 -18025  138 -18028 0

c  -2-1 --> break 
c    ( b^{69, 2}_2 ∧  b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨  b^{69, 2}_0 ∨  p_138 ∨ break
c  in DIMACS:
-18023 -18024  18025  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 2}_2 ∧ -b^{69, 2}_1 ∧ -b^{69, 2}_0 ∧ true) 
c  in CNF:
c    -b^{69, 2}_2 ∨  b^{69, 2}_1 ∨  b^{69, 2}_0 ∨ false 
c  in DIMACS:
-18023  18024  18025  0

c  3 does not represent an automaton state.
c    -(-b^{69, 2}_2 ∧  b^{69, 2}_1 ∧  b^{69, 2}_0 ∧ true) 
c  in CNF:
c     b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ false 
c  in DIMACS:
 18023 -18024 -18025  0
c  -3 does not represent an automaton state.
c    -( b^{69, 2}_2 ∧  b^{69, 2}_1 ∧  b^{69, 2}_0 ∧ true) 
c  in CNF:
c    -b^{69, 2}_2 ∨ -b^{69, 2}_1 ∨ -b^{69, 2}_0 ∨ false 
c  in DIMACS:
-18023 -18024 -18025  0

c i = 3
c  -2+1 --> -1
c    ( b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧  p_207) -> ( b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0)
c  in CNF:
c    -b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨  b^{69, 4}_2
c    -b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_1
c    -b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨  b^{69, 4}_0
c  in DIMACS:
-18026 -18027  18028 -207  18029 0
-18026 -18027  18028 -207 -18030 0
-18026 -18027  18028 -207  18031 0

c  -1+1 --> 0
c    ( b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0 ∧  p_207) -> (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧ -b^{69, 4}_0)
c  in CNF:
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_2
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_1
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_0
c  in DIMACS:
-18026  18027 -18028 -207 -18029 0
-18026  18027 -18028 -207 -18030 0
-18026  18027 -18028 -207 -18031 0

c  0+1 --> 1
c    (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧  p_207) -> (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0)
c  in CNF:
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_2
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_1
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨  b^{69, 4}_0
c  in DIMACS:
 18026  18027  18028 -207 -18029 0
 18026  18027  18028 -207 -18030 0
 18026  18027  18028 -207  18031 0

c  1+1 --> 2
c    (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0 ∧  p_207) -> (-b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0)
c  in CNF:
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_2
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨  b^{69, 4}_1
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ -p_207 ∨ -b^{69, 4}_0
c  in DIMACS:
 18026  18027 -18028 -207 -18029 0
 18026  18027 -18028 -207  18030 0
 18026  18027 -18028 -207 -18031 0

c  2+1 --> break 
c    (-b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧  p_207) -> break
c  in CNF:
c     b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 18026 -18027  18028 -207 1162 0


c  2-1 --> 1
c    (-b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧ -p_207) -> (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0)
c  in CNF:
c     b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_2
c     b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_1
c     b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨  b^{69, 4}_0
c  in DIMACS:
 18026 -18027  18028  207 -18029 0
 18026 -18027  18028  207 -18030 0
 18026 -18027  18028  207  18031 0

c  1-1 --> 0
c    (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0 ∧ -p_207) -> (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧ -b^{69, 4}_0)
c  in CNF:
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_2
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_1
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_0
c  in DIMACS:
 18026  18027 -18028  207 -18029 0
 18026  18027 -18028  207 -18030 0
 18026  18027 -18028  207 -18031 0

c  0-1 --> -1
c    (-b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧ -p_207) -> ( b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0)
c  in CNF:
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨  b^{69, 4}_2
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_1
c     b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨  b^{69, 4}_0
c  in DIMACS:
 18026  18027  18028  207  18029 0
 18026  18027  18028  207 -18030 0
 18026  18027  18028  207  18031 0

c  -1-1 --> -2
c    ( b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧  b^{69, 3}_0 ∧ -p_207) -> ( b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0)
c  in CNF:
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨  b^{69, 4}_2
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨  b^{69, 4}_1
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨  p_207 ∨ -b^{69, 4}_0
c  in DIMACS:
-18026  18027 -18028  207  18029 0
-18026  18027 -18028  207  18030 0
-18026  18027 -18028  207 -18031 0

c  -2-1 --> break 
c    ( b^{69, 3}_2 ∧  b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨  b^{69, 3}_0 ∨  p_207 ∨ break
c  in DIMACS:
-18026 -18027  18028  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 3}_2 ∧ -b^{69, 3}_1 ∧ -b^{69, 3}_0 ∧ true) 
c  in CNF:
c    -b^{69, 3}_2 ∨  b^{69, 3}_1 ∨  b^{69, 3}_0 ∨ false 
c  in DIMACS:
-18026  18027  18028  0

c  3 does not represent an automaton state.
c    -(-b^{69, 3}_2 ∧  b^{69, 3}_1 ∧  b^{69, 3}_0 ∧ true) 
c  in CNF:
c     b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ false 
c  in DIMACS:
 18026 -18027 -18028  0
c  -3 does not represent an automaton state.
c    -( b^{69, 3}_2 ∧  b^{69, 3}_1 ∧  b^{69, 3}_0 ∧ true) 
c  in CNF:
c    -b^{69, 3}_2 ∨ -b^{69, 3}_1 ∨ -b^{69, 3}_0 ∨ false 
c  in DIMACS:
-18026 -18027 -18028  0

c i = 4
c  -2+1 --> -1
c    ( b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧  p_276) -> ( b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0)
c  in CNF:
c    -b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨  b^{69, 5}_2
c    -b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_1
c    -b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨  b^{69, 5}_0
c  in DIMACS:
-18029 -18030  18031 -276  18032 0
-18029 -18030  18031 -276 -18033 0
-18029 -18030  18031 -276  18034 0

c  -1+1 --> 0
c    ( b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0 ∧  p_276) -> (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧ -b^{69, 5}_0)
c  in CNF:
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_2
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_1
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_0
c  in DIMACS:
-18029  18030 -18031 -276 -18032 0
-18029  18030 -18031 -276 -18033 0
-18029  18030 -18031 -276 -18034 0

c  0+1 --> 1
c    (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧  p_276) -> (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0)
c  in CNF:
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_2
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_1
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨  b^{69, 5}_0
c  in DIMACS:
 18029  18030  18031 -276 -18032 0
 18029  18030  18031 -276 -18033 0
 18029  18030  18031 -276  18034 0

c  1+1 --> 2
c    (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0 ∧  p_276) -> (-b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0)
c  in CNF:
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_2
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨  b^{69, 5}_1
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ -p_276 ∨ -b^{69, 5}_0
c  in DIMACS:
 18029  18030 -18031 -276 -18032 0
 18029  18030 -18031 -276  18033 0
 18029  18030 -18031 -276 -18034 0

c  2+1 --> break 
c    (-b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧  p_276) -> break
c  in CNF:
c     b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 18029 -18030  18031 -276 1162 0


c  2-1 --> 1
c    (-b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧ -p_276) -> (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0)
c  in CNF:
c     b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_2
c     b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_1
c     b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨  b^{69, 5}_0
c  in DIMACS:
 18029 -18030  18031  276 -18032 0
 18029 -18030  18031  276 -18033 0
 18029 -18030  18031  276  18034 0

c  1-1 --> 0
c    (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0 ∧ -p_276) -> (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧ -b^{69, 5}_0)
c  in CNF:
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_2
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_1
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_0
c  in DIMACS:
 18029  18030 -18031  276 -18032 0
 18029  18030 -18031  276 -18033 0
 18029  18030 -18031  276 -18034 0

c  0-1 --> -1
c    (-b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧ -p_276) -> ( b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0)
c  in CNF:
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨  b^{69, 5}_2
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_1
c     b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨  b^{69, 5}_0
c  in DIMACS:
 18029  18030  18031  276  18032 0
 18029  18030  18031  276 -18033 0
 18029  18030  18031  276  18034 0

c  -1-1 --> -2
c    ( b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧  b^{69, 4}_0 ∧ -p_276) -> ( b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0)
c  in CNF:
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨  b^{69, 5}_2
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨  b^{69, 5}_1
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨  p_276 ∨ -b^{69, 5}_0
c  in DIMACS:
-18029  18030 -18031  276  18032 0
-18029  18030 -18031  276  18033 0
-18029  18030 -18031  276 -18034 0

c  -2-1 --> break 
c    ( b^{69, 4}_2 ∧  b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨  b^{69, 4}_0 ∨  p_276 ∨ break
c  in DIMACS:
-18029 -18030  18031  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 4}_2 ∧ -b^{69, 4}_1 ∧ -b^{69, 4}_0 ∧ true) 
c  in CNF:
c    -b^{69, 4}_2 ∨  b^{69, 4}_1 ∨  b^{69, 4}_0 ∨ false 
c  in DIMACS:
-18029  18030  18031  0

c  3 does not represent an automaton state.
c    -(-b^{69, 4}_2 ∧  b^{69, 4}_1 ∧  b^{69, 4}_0 ∧ true) 
c  in CNF:
c     b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ false 
c  in DIMACS:
 18029 -18030 -18031  0
c  -3 does not represent an automaton state.
c    -( b^{69, 4}_2 ∧  b^{69, 4}_1 ∧  b^{69, 4}_0 ∧ true) 
c  in CNF:
c    -b^{69, 4}_2 ∨ -b^{69, 4}_1 ∨ -b^{69, 4}_0 ∨ false 
c  in DIMACS:
-18029 -18030 -18031  0

c i = 5
c  -2+1 --> -1
c    ( b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧  p_345) -> ( b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0)
c  in CNF:
c    -b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨  b^{69, 6}_2
c    -b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_1
c    -b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨  b^{69, 6}_0
c  in DIMACS:
-18032 -18033  18034 -345  18035 0
-18032 -18033  18034 -345 -18036 0
-18032 -18033  18034 -345  18037 0

c  -1+1 --> 0
c    ( b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0 ∧  p_345) -> (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧ -b^{69, 6}_0)
c  in CNF:
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_2
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_1
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_0
c  in DIMACS:
-18032  18033 -18034 -345 -18035 0
-18032  18033 -18034 -345 -18036 0
-18032  18033 -18034 -345 -18037 0

c  0+1 --> 1
c    (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧  p_345) -> (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0)
c  in CNF:
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_2
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_1
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨  b^{69, 6}_0
c  in DIMACS:
 18032  18033  18034 -345 -18035 0
 18032  18033  18034 -345 -18036 0
 18032  18033  18034 -345  18037 0

c  1+1 --> 2
c    (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0 ∧  p_345) -> (-b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0)
c  in CNF:
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_2
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨  b^{69, 6}_1
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ -p_345 ∨ -b^{69, 6}_0
c  in DIMACS:
 18032  18033 -18034 -345 -18035 0
 18032  18033 -18034 -345  18036 0
 18032  18033 -18034 -345 -18037 0

c  2+1 --> break 
c    (-b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧  p_345) -> break
c  in CNF:
c     b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 18032 -18033  18034 -345 1162 0


c  2-1 --> 1
c    (-b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧ -p_345) -> (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0)
c  in CNF:
c     b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_2
c     b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_1
c     b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨  b^{69, 6}_0
c  in DIMACS:
 18032 -18033  18034  345 -18035 0
 18032 -18033  18034  345 -18036 0
 18032 -18033  18034  345  18037 0

c  1-1 --> 0
c    (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0 ∧ -p_345) -> (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧ -b^{69, 6}_0)
c  in CNF:
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_2
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_1
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_0
c  in DIMACS:
 18032  18033 -18034  345 -18035 0
 18032  18033 -18034  345 -18036 0
 18032  18033 -18034  345 -18037 0

c  0-1 --> -1
c    (-b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧ -p_345) -> ( b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0)
c  in CNF:
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨  b^{69, 6}_2
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_1
c     b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨  b^{69, 6}_0
c  in DIMACS:
 18032  18033  18034  345  18035 0
 18032  18033  18034  345 -18036 0
 18032  18033  18034  345  18037 0

c  -1-1 --> -2
c    ( b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧  b^{69, 5}_0 ∧ -p_345) -> ( b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0)
c  in CNF:
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨  b^{69, 6}_2
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨  b^{69, 6}_1
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨  p_345 ∨ -b^{69, 6}_0
c  in DIMACS:
-18032  18033 -18034  345  18035 0
-18032  18033 -18034  345  18036 0
-18032  18033 -18034  345 -18037 0

c  -2-1 --> break 
c    ( b^{69, 5}_2 ∧  b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨  b^{69, 5}_0 ∨  p_345 ∨ break
c  in DIMACS:
-18032 -18033  18034  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 5}_2 ∧ -b^{69, 5}_1 ∧ -b^{69, 5}_0 ∧ true) 
c  in CNF:
c    -b^{69, 5}_2 ∨  b^{69, 5}_1 ∨  b^{69, 5}_0 ∨ false 
c  in DIMACS:
-18032  18033  18034  0

c  3 does not represent an automaton state.
c    -(-b^{69, 5}_2 ∧  b^{69, 5}_1 ∧  b^{69, 5}_0 ∧ true) 
c  in CNF:
c     b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ false 
c  in DIMACS:
 18032 -18033 -18034  0
c  -3 does not represent an automaton state.
c    -( b^{69, 5}_2 ∧  b^{69, 5}_1 ∧  b^{69, 5}_0 ∧ true) 
c  in CNF:
c    -b^{69, 5}_2 ∨ -b^{69, 5}_1 ∨ -b^{69, 5}_0 ∨ false 
c  in DIMACS:
-18032 -18033 -18034  0

c i = 6
c  -2+1 --> -1
c    ( b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧  p_414) -> ( b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0)
c  in CNF:
c    -b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨  b^{69, 7}_2
c    -b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_1
c    -b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨  b^{69, 7}_0
c  in DIMACS:
-18035 -18036  18037 -414  18038 0
-18035 -18036  18037 -414 -18039 0
-18035 -18036  18037 -414  18040 0

c  -1+1 --> 0
c    ( b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0 ∧  p_414) -> (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧ -b^{69, 7}_0)
c  in CNF:
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_2
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_1
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_0
c  in DIMACS:
-18035  18036 -18037 -414 -18038 0
-18035  18036 -18037 -414 -18039 0
-18035  18036 -18037 -414 -18040 0

c  0+1 --> 1
c    (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧  p_414) -> (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0)
c  in CNF:
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_2
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_1
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨  b^{69, 7}_0
c  in DIMACS:
 18035  18036  18037 -414 -18038 0
 18035  18036  18037 -414 -18039 0
 18035  18036  18037 -414  18040 0

c  1+1 --> 2
c    (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0 ∧  p_414) -> (-b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0)
c  in CNF:
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_2
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨  b^{69, 7}_1
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ -p_414 ∨ -b^{69, 7}_0
c  in DIMACS:
 18035  18036 -18037 -414 -18038 0
 18035  18036 -18037 -414  18039 0
 18035  18036 -18037 -414 -18040 0

c  2+1 --> break 
c    (-b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧  p_414) -> break
c  in CNF:
c     b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 18035 -18036  18037 -414 1162 0


c  2-1 --> 1
c    (-b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧ -p_414) -> (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0)
c  in CNF:
c     b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_2
c     b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_1
c     b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨  b^{69, 7}_0
c  in DIMACS:
 18035 -18036  18037  414 -18038 0
 18035 -18036  18037  414 -18039 0
 18035 -18036  18037  414  18040 0

c  1-1 --> 0
c    (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0 ∧ -p_414) -> (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧ -b^{69, 7}_0)
c  in CNF:
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_2
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_1
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_0
c  in DIMACS:
 18035  18036 -18037  414 -18038 0
 18035  18036 -18037  414 -18039 0
 18035  18036 -18037  414 -18040 0

c  0-1 --> -1
c    (-b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧ -p_414) -> ( b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0)
c  in CNF:
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨  b^{69, 7}_2
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_1
c     b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨  b^{69, 7}_0
c  in DIMACS:
 18035  18036  18037  414  18038 0
 18035  18036  18037  414 -18039 0
 18035  18036  18037  414  18040 0

c  -1-1 --> -2
c    ( b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧  b^{69, 6}_0 ∧ -p_414) -> ( b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0)
c  in CNF:
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨  b^{69, 7}_2
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨  b^{69, 7}_1
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨  p_414 ∨ -b^{69, 7}_0
c  in DIMACS:
-18035  18036 -18037  414  18038 0
-18035  18036 -18037  414  18039 0
-18035  18036 -18037  414 -18040 0

c  -2-1 --> break 
c    ( b^{69, 6}_2 ∧  b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨  b^{69, 6}_0 ∨  p_414 ∨ break
c  in DIMACS:
-18035 -18036  18037  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 6}_2 ∧ -b^{69, 6}_1 ∧ -b^{69, 6}_0 ∧ true) 
c  in CNF:
c    -b^{69, 6}_2 ∨  b^{69, 6}_1 ∨  b^{69, 6}_0 ∨ false 
c  in DIMACS:
-18035  18036  18037  0

c  3 does not represent an automaton state.
c    -(-b^{69, 6}_2 ∧  b^{69, 6}_1 ∧  b^{69, 6}_0 ∧ true) 
c  in CNF:
c     b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ false 
c  in DIMACS:
 18035 -18036 -18037  0
c  -3 does not represent an automaton state.
c    -( b^{69, 6}_2 ∧  b^{69, 6}_1 ∧  b^{69, 6}_0 ∧ true) 
c  in CNF:
c    -b^{69, 6}_2 ∨ -b^{69, 6}_1 ∨ -b^{69, 6}_0 ∨ false 
c  in DIMACS:
-18035 -18036 -18037  0

c i = 7
c  -2+1 --> -1
c    ( b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧  p_483) -> ( b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0)
c  in CNF:
c    -b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨  b^{69, 8}_2
c    -b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_1
c    -b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨  b^{69, 8}_0
c  in DIMACS:
-18038 -18039  18040 -483  18041 0
-18038 -18039  18040 -483 -18042 0
-18038 -18039  18040 -483  18043 0

c  -1+1 --> 0
c    ( b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0 ∧  p_483) -> (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧ -b^{69, 8}_0)
c  in CNF:
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_2
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_1
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_0
c  in DIMACS:
-18038  18039 -18040 -483 -18041 0
-18038  18039 -18040 -483 -18042 0
-18038  18039 -18040 -483 -18043 0

c  0+1 --> 1
c    (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧  p_483) -> (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0)
c  in CNF:
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_2
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_1
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨  b^{69, 8}_0
c  in DIMACS:
 18038  18039  18040 -483 -18041 0
 18038  18039  18040 -483 -18042 0
 18038  18039  18040 -483  18043 0

c  1+1 --> 2
c    (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0 ∧  p_483) -> (-b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0)
c  in CNF:
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_2
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨  b^{69, 8}_1
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ -p_483 ∨ -b^{69, 8}_0
c  in DIMACS:
 18038  18039 -18040 -483 -18041 0
 18038  18039 -18040 -483  18042 0
 18038  18039 -18040 -483 -18043 0

c  2+1 --> break 
c    (-b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧  p_483) -> break
c  in CNF:
c     b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 18038 -18039  18040 -483 1162 0


c  2-1 --> 1
c    (-b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧ -p_483) -> (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0)
c  in CNF:
c     b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_2
c     b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_1
c     b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨  b^{69, 8}_0
c  in DIMACS:
 18038 -18039  18040  483 -18041 0
 18038 -18039  18040  483 -18042 0
 18038 -18039  18040  483  18043 0

c  1-1 --> 0
c    (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0 ∧ -p_483) -> (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧ -b^{69, 8}_0)
c  in CNF:
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_2
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_1
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_0
c  in DIMACS:
 18038  18039 -18040  483 -18041 0
 18038  18039 -18040  483 -18042 0
 18038  18039 -18040  483 -18043 0

c  0-1 --> -1
c    (-b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧ -p_483) -> ( b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0)
c  in CNF:
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨  b^{69, 8}_2
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_1
c     b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨  b^{69, 8}_0
c  in DIMACS:
 18038  18039  18040  483  18041 0
 18038  18039  18040  483 -18042 0
 18038  18039  18040  483  18043 0

c  -1-1 --> -2
c    ( b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧  b^{69, 7}_0 ∧ -p_483) -> ( b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0)
c  in CNF:
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨  b^{69, 8}_2
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨  b^{69, 8}_1
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨  p_483 ∨ -b^{69, 8}_0
c  in DIMACS:
-18038  18039 -18040  483  18041 0
-18038  18039 -18040  483  18042 0
-18038  18039 -18040  483 -18043 0

c  -2-1 --> break 
c    ( b^{69, 7}_2 ∧  b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨  b^{69, 7}_0 ∨  p_483 ∨ break
c  in DIMACS:
-18038 -18039  18040  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 7}_2 ∧ -b^{69, 7}_1 ∧ -b^{69, 7}_0 ∧ true) 
c  in CNF:
c    -b^{69, 7}_2 ∨  b^{69, 7}_1 ∨  b^{69, 7}_0 ∨ false 
c  in DIMACS:
-18038  18039  18040  0

c  3 does not represent an automaton state.
c    -(-b^{69, 7}_2 ∧  b^{69, 7}_1 ∧  b^{69, 7}_0 ∧ true) 
c  in CNF:
c     b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ false 
c  in DIMACS:
 18038 -18039 -18040  0
c  -3 does not represent an automaton state.
c    -( b^{69, 7}_2 ∧  b^{69, 7}_1 ∧  b^{69, 7}_0 ∧ true) 
c  in CNF:
c    -b^{69, 7}_2 ∨ -b^{69, 7}_1 ∨ -b^{69, 7}_0 ∨ false 
c  in DIMACS:
-18038 -18039 -18040  0

c i = 8
c  -2+1 --> -1
c    ( b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧  p_552) -> ( b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0)
c  in CNF:
c    -b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨  b^{69, 9}_2
c    -b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_1
c    -b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨  b^{69, 9}_0
c  in DIMACS:
-18041 -18042  18043 -552  18044 0
-18041 -18042  18043 -552 -18045 0
-18041 -18042  18043 -552  18046 0

c  -1+1 --> 0
c    ( b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0 ∧  p_552) -> (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧ -b^{69, 9}_0)
c  in CNF:
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_2
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_1
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_0
c  in DIMACS:
-18041  18042 -18043 -552 -18044 0
-18041  18042 -18043 -552 -18045 0
-18041  18042 -18043 -552 -18046 0

c  0+1 --> 1
c    (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧  p_552) -> (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0)
c  in CNF:
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_2
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_1
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨  b^{69, 9}_0
c  in DIMACS:
 18041  18042  18043 -552 -18044 0
 18041  18042  18043 -552 -18045 0
 18041  18042  18043 -552  18046 0

c  1+1 --> 2
c    (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0 ∧  p_552) -> (-b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0)
c  in CNF:
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_2
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨  b^{69, 9}_1
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ -p_552 ∨ -b^{69, 9}_0
c  in DIMACS:
 18041  18042 -18043 -552 -18044 0
 18041  18042 -18043 -552  18045 0
 18041  18042 -18043 -552 -18046 0

c  2+1 --> break 
c    (-b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧  p_552) -> break
c  in CNF:
c     b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 18041 -18042  18043 -552 1162 0


c  2-1 --> 1
c    (-b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧ -p_552) -> (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0)
c  in CNF:
c     b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_2
c     b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_1
c     b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨  b^{69, 9}_0
c  in DIMACS:
 18041 -18042  18043  552 -18044 0
 18041 -18042  18043  552 -18045 0
 18041 -18042  18043  552  18046 0

c  1-1 --> 0
c    (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0 ∧ -p_552) -> (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧ -b^{69, 9}_0)
c  in CNF:
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_2
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_1
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_0
c  in DIMACS:
 18041  18042 -18043  552 -18044 0
 18041  18042 -18043  552 -18045 0
 18041  18042 -18043  552 -18046 0

c  0-1 --> -1
c    (-b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧ -p_552) -> ( b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0)
c  in CNF:
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨  b^{69, 9}_2
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_1
c     b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨  b^{69, 9}_0
c  in DIMACS:
 18041  18042  18043  552  18044 0
 18041  18042  18043  552 -18045 0
 18041  18042  18043  552  18046 0

c  -1-1 --> -2
c    ( b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧  b^{69, 8}_0 ∧ -p_552) -> ( b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0)
c  in CNF:
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨  b^{69, 9}_2
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨  b^{69, 9}_1
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨  p_552 ∨ -b^{69, 9}_0
c  in DIMACS:
-18041  18042 -18043  552  18044 0
-18041  18042 -18043  552  18045 0
-18041  18042 -18043  552 -18046 0

c  -2-1 --> break 
c    ( b^{69, 8}_2 ∧  b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨  b^{69, 8}_0 ∨  p_552 ∨ break
c  in DIMACS:
-18041 -18042  18043  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 8}_2 ∧ -b^{69, 8}_1 ∧ -b^{69, 8}_0 ∧ true) 
c  in CNF:
c    -b^{69, 8}_2 ∨  b^{69, 8}_1 ∨  b^{69, 8}_0 ∨ false 
c  in DIMACS:
-18041  18042  18043  0

c  3 does not represent an automaton state.
c    -(-b^{69, 8}_2 ∧  b^{69, 8}_1 ∧  b^{69, 8}_0 ∧ true) 
c  in CNF:
c     b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ false 
c  in DIMACS:
 18041 -18042 -18043  0
c  -3 does not represent an automaton state.
c    -( b^{69, 8}_2 ∧  b^{69, 8}_1 ∧  b^{69, 8}_0 ∧ true) 
c  in CNF:
c    -b^{69, 8}_2 ∨ -b^{69, 8}_1 ∨ -b^{69, 8}_0 ∨ false 
c  in DIMACS:
-18041 -18042 -18043  0

c i = 9
c  -2+1 --> -1
c    ( b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧  p_621) -> ( b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0)
c  in CNF:
c    -b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨  b^{69, 10}_2
c    -b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_1
c    -b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨  b^{69, 10}_0
c  in DIMACS:
-18044 -18045  18046 -621  18047 0
-18044 -18045  18046 -621 -18048 0
-18044 -18045  18046 -621  18049 0

c  -1+1 --> 0
c    ( b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0 ∧  p_621) -> (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧ -b^{69, 10}_0)
c  in CNF:
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_2
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_1
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_0
c  in DIMACS:
-18044  18045 -18046 -621 -18047 0
-18044  18045 -18046 -621 -18048 0
-18044  18045 -18046 -621 -18049 0

c  0+1 --> 1
c    (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧  p_621) -> (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0)
c  in CNF:
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_2
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_1
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨  b^{69, 10}_0
c  in DIMACS:
 18044  18045  18046 -621 -18047 0
 18044  18045  18046 -621 -18048 0
 18044  18045  18046 -621  18049 0

c  1+1 --> 2
c    (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0 ∧  p_621) -> (-b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0)
c  in CNF:
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_2
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨  b^{69, 10}_1
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ -p_621 ∨ -b^{69, 10}_0
c  in DIMACS:
 18044  18045 -18046 -621 -18047 0
 18044  18045 -18046 -621  18048 0
 18044  18045 -18046 -621 -18049 0

c  2+1 --> break 
c    (-b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧  p_621) -> break
c  in CNF:
c     b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 18044 -18045  18046 -621 1162 0


c  2-1 --> 1
c    (-b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧ -p_621) -> (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0)
c  in CNF:
c     b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_2
c     b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_1
c     b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨  b^{69, 10}_0
c  in DIMACS:
 18044 -18045  18046  621 -18047 0
 18044 -18045  18046  621 -18048 0
 18044 -18045  18046  621  18049 0

c  1-1 --> 0
c    (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0 ∧ -p_621) -> (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧ -b^{69, 10}_0)
c  in CNF:
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_2
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_1
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_0
c  in DIMACS:
 18044  18045 -18046  621 -18047 0
 18044  18045 -18046  621 -18048 0
 18044  18045 -18046  621 -18049 0

c  0-1 --> -1
c    (-b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧ -p_621) -> ( b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0)
c  in CNF:
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨  b^{69, 10}_2
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_1
c     b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨  b^{69, 10}_0
c  in DIMACS:
 18044  18045  18046  621  18047 0
 18044  18045  18046  621 -18048 0
 18044  18045  18046  621  18049 0

c  -1-1 --> -2
c    ( b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧  b^{69, 9}_0 ∧ -p_621) -> ( b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0)
c  in CNF:
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨  b^{69, 10}_2
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨  b^{69, 10}_1
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨  p_621 ∨ -b^{69, 10}_0
c  in DIMACS:
-18044  18045 -18046  621  18047 0
-18044  18045 -18046  621  18048 0
-18044  18045 -18046  621 -18049 0

c  -2-1 --> break 
c    ( b^{69, 9}_2 ∧  b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨  b^{69, 9}_0 ∨  p_621 ∨ break
c  in DIMACS:
-18044 -18045  18046  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 9}_2 ∧ -b^{69, 9}_1 ∧ -b^{69, 9}_0 ∧ true) 
c  in CNF:
c    -b^{69, 9}_2 ∨  b^{69, 9}_1 ∨  b^{69, 9}_0 ∨ false 
c  in DIMACS:
-18044  18045  18046  0

c  3 does not represent an automaton state.
c    -(-b^{69, 9}_2 ∧  b^{69, 9}_1 ∧  b^{69, 9}_0 ∧ true) 
c  in CNF:
c     b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ false 
c  in DIMACS:
 18044 -18045 -18046  0
c  -3 does not represent an automaton state.
c    -( b^{69, 9}_2 ∧  b^{69, 9}_1 ∧  b^{69, 9}_0 ∧ true) 
c  in CNF:
c    -b^{69, 9}_2 ∨ -b^{69, 9}_1 ∨ -b^{69, 9}_0 ∨ false 
c  in DIMACS:
-18044 -18045 -18046  0

c i = 10
c  -2+1 --> -1
c    ( b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧  p_690) -> ( b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0)
c  in CNF:
c    -b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨  b^{69, 11}_2
c    -b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_1
c    -b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨  b^{69, 11}_0
c  in DIMACS:
-18047 -18048  18049 -690  18050 0
-18047 -18048  18049 -690 -18051 0
-18047 -18048  18049 -690  18052 0

c  -1+1 --> 0
c    ( b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0 ∧  p_690) -> (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧ -b^{69, 11}_0)
c  in CNF:
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_2
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_1
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_0
c  in DIMACS:
-18047  18048 -18049 -690 -18050 0
-18047  18048 -18049 -690 -18051 0
-18047  18048 -18049 -690 -18052 0

c  0+1 --> 1
c    (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧  p_690) -> (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0)
c  in CNF:
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_2
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_1
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨  b^{69, 11}_0
c  in DIMACS:
 18047  18048  18049 -690 -18050 0
 18047  18048  18049 -690 -18051 0
 18047  18048  18049 -690  18052 0

c  1+1 --> 2
c    (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0 ∧  p_690) -> (-b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0)
c  in CNF:
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_2
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨  b^{69, 11}_1
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ -p_690 ∨ -b^{69, 11}_0
c  in DIMACS:
 18047  18048 -18049 -690 -18050 0
 18047  18048 -18049 -690  18051 0
 18047  18048 -18049 -690 -18052 0

c  2+1 --> break 
c    (-b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧  p_690) -> break
c  in CNF:
c     b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 18047 -18048  18049 -690 1162 0


c  2-1 --> 1
c    (-b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧ -p_690) -> (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0)
c  in CNF:
c     b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_2
c     b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_1
c     b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨  b^{69, 11}_0
c  in DIMACS:
 18047 -18048  18049  690 -18050 0
 18047 -18048  18049  690 -18051 0
 18047 -18048  18049  690  18052 0

c  1-1 --> 0
c    (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0 ∧ -p_690) -> (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧ -b^{69, 11}_0)
c  in CNF:
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_2
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_1
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_0
c  in DIMACS:
 18047  18048 -18049  690 -18050 0
 18047  18048 -18049  690 -18051 0
 18047  18048 -18049  690 -18052 0

c  0-1 --> -1
c    (-b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧ -p_690) -> ( b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0)
c  in CNF:
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨  b^{69, 11}_2
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_1
c     b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨  b^{69, 11}_0
c  in DIMACS:
 18047  18048  18049  690  18050 0
 18047  18048  18049  690 -18051 0
 18047  18048  18049  690  18052 0

c  -1-1 --> -2
c    ( b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧  b^{69, 10}_0 ∧ -p_690) -> ( b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0)
c  in CNF:
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨  b^{69, 11}_2
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨  b^{69, 11}_1
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨  p_690 ∨ -b^{69, 11}_0
c  in DIMACS:
-18047  18048 -18049  690  18050 0
-18047  18048 -18049  690  18051 0
-18047  18048 -18049  690 -18052 0

c  -2-1 --> break 
c    ( b^{69, 10}_2 ∧  b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨  b^{69, 10}_0 ∨  p_690 ∨ break
c  in DIMACS:
-18047 -18048  18049  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 10}_2 ∧ -b^{69, 10}_1 ∧ -b^{69, 10}_0 ∧ true) 
c  in CNF:
c    -b^{69, 10}_2 ∨  b^{69, 10}_1 ∨  b^{69, 10}_0 ∨ false 
c  in DIMACS:
-18047  18048  18049  0

c  3 does not represent an automaton state.
c    -(-b^{69, 10}_2 ∧  b^{69, 10}_1 ∧  b^{69, 10}_0 ∧ true) 
c  in CNF:
c     b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ false 
c  in DIMACS:
 18047 -18048 -18049  0
c  -3 does not represent an automaton state.
c    -( b^{69, 10}_2 ∧  b^{69, 10}_1 ∧  b^{69, 10}_0 ∧ true) 
c  in CNF:
c    -b^{69, 10}_2 ∨ -b^{69, 10}_1 ∨ -b^{69, 10}_0 ∨ false 
c  in DIMACS:
-18047 -18048 -18049  0

c i = 11
c  -2+1 --> -1
c    ( b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧  p_759) -> ( b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0)
c  in CNF:
c    -b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨  b^{69, 12}_2
c    -b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_1
c    -b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨  b^{69, 12}_0
c  in DIMACS:
-18050 -18051  18052 -759  18053 0
-18050 -18051  18052 -759 -18054 0
-18050 -18051  18052 -759  18055 0

c  -1+1 --> 0
c    ( b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0 ∧  p_759) -> (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧ -b^{69, 12}_0)
c  in CNF:
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_2
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_1
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_0
c  in DIMACS:
-18050  18051 -18052 -759 -18053 0
-18050  18051 -18052 -759 -18054 0
-18050  18051 -18052 -759 -18055 0

c  0+1 --> 1
c    (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧  p_759) -> (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0)
c  in CNF:
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_2
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_1
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨  b^{69, 12}_0
c  in DIMACS:
 18050  18051  18052 -759 -18053 0
 18050  18051  18052 -759 -18054 0
 18050  18051  18052 -759  18055 0

c  1+1 --> 2
c    (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0 ∧  p_759) -> (-b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0)
c  in CNF:
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_2
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨  b^{69, 12}_1
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ -p_759 ∨ -b^{69, 12}_0
c  in DIMACS:
 18050  18051 -18052 -759 -18053 0
 18050  18051 -18052 -759  18054 0
 18050  18051 -18052 -759 -18055 0

c  2+1 --> break 
c    (-b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧  p_759) -> break
c  in CNF:
c     b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 18050 -18051  18052 -759 1162 0


c  2-1 --> 1
c    (-b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧ -p_759) -> (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0)
c  in CNF:
c     b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_2
c     b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_1
c     b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨  b^{69, 12}_0
c  in DIMACS:
 18050 -18051  18052  759 -18053 0
 18050 -18051  18052  759 -18054 0
 18050 -18051  18052  759  18055 0

c  1-1 --> 0
c    (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0 ∧ -p_759) -> (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧ -b^{69, 12}_0)
c  in CNF:
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_2
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_1
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_0
c  in DIMACS:
 18050  18051 -18052  759 -18053 0
 18050  18051 -18052  759 -18054 0
 18050  18051 -18052  759 -18055 0

c  0-1 --> -1
c    (-b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧ -p_759) -> ( b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0)
c  in CNF:
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨  b^{69, 12}_2
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_1
c     b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨  b^{69, 12}_0
c  in DIMACS:
 18050  18051  18052  759  18053 0
 18050  18051  18052  759 -18054 0
 18050  18051  18052  759  18055 0

c  -1-1 --> -2
c    ( b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧  b^{69, 11}_0 ∧ -p_759) -> ( b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0)
c  in CNF:
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨  b^{69, 12}_2
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨  b^{69, 12}_1
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨  p_759 ∨ -b^{69, 12}_0
c  in DIMACS:
-18050  18051 -18052  759  18053 0
-18050  18051 -18052  759  18054 0
-18050  18051 -18052  759 -18055 0

c  -2-1 --> break 
c    ( b^{69, 11}_2 ∧  b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨  b^{69, 11}_0 ∨  p_759 ∨ break
c  in DIMACS:
-18050 -18051  18052  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 11}_2 ∧ -b^{69, 11}_1 ∧ -b^{69, 11}_0 ∧ true) 
c  in CNF:
c    -b^{69, 11}_2 ∨  b^{69, 11}_1 ∨  b^{69, 11}_0 ∨ false 
c  in DIMACS:
-18050  18051  18052  0

c  3 does not represent an automaton state.
c    -(-b^{69, 11}_2 ∧  b^{69, 11}_1 ∧  b^{69, 11}_0 ∧ true) 
c  in CNF:
c     b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ false 
c  in DIMACS:
 18050 -18051 -18052  0
c  -3 does not represent an automaton state.
c    -( b^{69, 11}_2 ∧  b^{69, 11}_1 ∧  b^{69, 11}_0 ∧ true) 
c  in CNF:
c    -b^{69, 11}_2 ∨ -b^{69, 11}_1 ∨ -b^{69, 11}_0 ∨ false 
c  in DIMACS:
-18050 -18051 -18052  0

c i = 12
c  -2+1 --> -1
c    ( b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧  p_828) -> ( b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0)
c  in CNF:
c    -b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨  b^{69, 13}_2
c    -b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_1
c    -b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨  b^{69, 13}_0
c  in DIMACS:
-18053 -18054  18055 -828  18056 0
-18053 -18054  18055 -828 -18057 0
-18053 -18054  18055 -828  18058 0

c  -1+1 --> 0
c    ( b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0 ∧  p_828) -> (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧ -b^{69, 13}_0)
c  in CNF:
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_2
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_1
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_0
c  in DIMACS:
-18053  18054 -18055 -828 -18056 0
-18053  18054 -18055 -828 -18057 0
-18053  18054 -18055 -828 -18058 0

c  0+1 --> 1
c    (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧  p_828) -> (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0)
c  in CNF:
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_2
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_1
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨  b^{69, 13}_0
c  in DIMACS:
 18053  18054  18055 -828 -18056 0
 18053  18054  18055 -828 -18057 0
 18053  18054  18055 -828  18058 0

c  1+1 --> 2
c    (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0 ∧  p_828) -> (-b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0)
c  in CNF:
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_2
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨  b^{69, 13}_1
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ -p_828 ∨ -b^{69, 13}_0
c  in DIMACS:
 18053  18054 -18055 -828 -18056 0
 18053  18054 -18055 -828  18057 0
 18053  18054 -18055 -828 -18058 0

c  2+1 --> break 
c    (-b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧  p_828) -> break
c  in CNF:
c     b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 18053 -18054  18055 -828 1162 0


c  2-1 --> 1
c    (-b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧ -p_828) -> (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0)
c  in CNF:
c     b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_2
c     b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_1
c     b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨  b^{69, 13}_0
c  in DIMACS:
 18053 -18054  18055  828 -18056 0
 18053 -18054  18055  828 -18057 0
 18053 -18054  18055  828  18058 0

c  1-1 --> 0
c    (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0 ∧ -p_828) -> (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧ -b^{69, 13}_0)
c  in CNF:
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_2
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_1
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_0
c  in DIMACS:
 18053  18054 -18055  828 -18056 0
 18053  18054 -18055  828 -18057 0
 18053  18054 -18055  828 -18058 0

c  0-1 --> -1
c    (-b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧ -p_828) -> ( b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0)
c  in CNF:
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨  b^{69, 13}_2
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_1
c     b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨  b^{69, 13}_0
c  in DIMACS:
 18053  18054  18055  828  18056 0
 18053  18054  18055  828 -18057 0
 18053  18054  18055  828  18058 0

c  -1-1 --> -2
c    ( b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧  b^{69, 12}_0 ∧ -p_828) -> ( b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0)
c  in CNF:
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨  b^{69, 13}_2
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨  b^{69, 13}_1
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨  p_828 ∨ -b^{69, 13}_0
c  in DIMACS:
-18053  18054 -18055  828  18056 0
-18053  18054 -18055  828  18057 0
-18053  18054 -18055  828 -18058 0

c  -2-1 --> break 
c    ( b^{69, 12}_2 ∧  b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨  b^{69, 12}_0 ∨  p_828 ∨ break
c  in DIMACS:
-18053 -18054  18055  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 12}_2 ∧ -b^{69, 12}_1 ∧ -b^{69, 12}_0 ∧ true) 
c  in CNF:
c    -b^{69, 12}_2 ∨  b^{69, 12}_1 ∨  b^{69, 12}_0 ∨ false 
c  in DIMACS:
-18053  18054  18055  0

c  3 does not represent an automaton state.
c    -(-b^{69, 12}_2 ∧  b^{69, 12}_1 ∧  b^{69, 12}_0 ∧ true) 
c  in CNF:
c     b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ false 
c  in DIMACS:
 18053 -18054 -18055  0
c  -3 does not represent an automaton state.
c    -( b^{69, 12}_2 ∧  b^{69, 12}_1 ∧  b^{69, 12}_0 ∧ true) 
c  in CNF:
c    -b^{69, 12}_2 ∨ -b^{69, 12}_1 ∨ -b^{69, 12}_0 ∨ false 
c  in DIMACS:
-18053 -18054 -18055  0

c i = 13
c  -2+1 --> -1
c    ( b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧  p_897) -> ( b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0)
c  in CNF:
c    -b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨  b^{69, 14}_2
c    -b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_1
c    -b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨  b^{69, 14}_0
c  in DIMACS:
-18056 -18057  18058 -897  18059 0
-18056 -18057  18058 -897 -18060 0
-18056 -18057  18058 -897  18061 0

c  -1+1 --> 0
c    ( b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0 ∧  p_897) -> (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧ -b^{69, 14}_0)
c  in CNF:
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_2
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_1
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_0
c  in DIMACS:
-18056  18057 -18058 -897 -18059 0
-18056  18057 -18058 -897 -18060 0
-18056  18057 -18058 -897 -18061 0

c  0+1 --> 1
c    (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧  p_897) -> (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0)
c  in CNF:
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_2
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_1
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨  b^{69, 14}_0
c  in DIMACS:
 18056  18057  18058 -897 -18059 0
 18056  18057  18058 -897 -18060 0
 18056  18057  18058 -897  18061 0

c  1+1 --> 2
c    (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0 ∧  p_897) -> (-b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0)
c  in CNF:
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_2
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨  b^{69, 14}_1
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ -p_897 ∨ -b^{69, 14}_0
c  in DIMACS:
 18056  18057 -18058 -897 -18059 0
 18056  18057 -18058 -897  18060 0
 18056  18057 -18058 -897 -18061 0

c  2+1 --> break 
c    (-b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧  p_897) -> break
c  in CNF:
c     b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 18056 -18057  18058 -897 1162 0


c  2-1 --> 1
c    (-b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧ -p_897) -> (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0)
c  in CNF:
c     b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_2
c     b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_1
c     b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨  b^{69, 14}_0
c  in DIMACS:
 18056 -18057  18058  897 -18059 0
 18056 -18057  18058  897 -18060 0
 18056 -18057  18058  897  18061 0

c  1-1 --> 0
c    (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0 ∧ -p_897) -> (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧ -b^{69, 14}_0)
c  in CNF:
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_2
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_1
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_0
c  in DIMACS:
 18056  18057 -18058  897 -18059 0
 18056  18057 -18058  897 -18060 0
 18056  18057 -18058  897 -18061 0

c  0-1 --> -1
c    (-b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧ -p_897) -> ( b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0)
c  in CNF:
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨  b^{69, 14}_2
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_1
c     b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨  b^{69, 14}_0
c  in DIMACS:
 18056  18057  18058  897  18059 0
 18056  18057  18058  897 -18060 0
 18056  18057  18058  897  18061 0

c  -1-1 --> -2
c    ( b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧  b^{69, 13}_0 ∧ -p_897) -> ( b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0)
c  in CNF:
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨  b^{69, 14}_2
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨  b^{69, 14}_1
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨  p_897 ∨ -b^{69, 14}_0
c  in DIMACS:
-18056  18057 -18058  897  18059 0
-18056  18057 -18058  897  18060 0
-18056  18057 -18058  897 -18061 0

c  -2-1 --> break 
c    ( b^{69, 13}_2 ∧  b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨  b^{69, 13}_0 ∨  p_897 ∨ break
c  in DIMACS:
-18056 -18057  18058  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 13}_2 ∧ -b^{69, 13}_1 ∧ -b^{69, 13}_0 ∧ true) 
c  in CNF:
c    -b^{69, 13}_2 ∨  b^{69, 13}_1 ∨  b^{69, 13}_0 ∨ false 
c  in DIMACS:
-18056  18057  18058  0

c  3 does not represent an automaton state.
c    -(-b^{69, 13}_2 ∧  b^{69, 13}_1 ∧  b^{69, 13}_0 ∧ true) 
c  in CNF:
c     b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ false 
c  in DIMACS:
 18056 -18057 -18058  0
c  -3 does not represent an automaton state.
c    -( b^{69, 13}_2 ∧  b^{69, 13}_1 ∧  b^{69, 13}_0 ∧ true) 
c  in CNF:
c    -b^{69, 13}_2 ∨ -b^{69, 13}_1 ∨ -b^{69, 13}_0 ∨ false 
c  in DIMACS:
-18056 -18057 -18058  0

c i = 14
c  -2+1 --> -1
c    ( b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧  p_966) -> ( b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0)
c  in CNF:
c    -b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨  b^{69, 15}_2
c    -b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_1
c    -b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨  b^{69, 15}_0
c  in DIMACS:
-18059 -18060  18061 -966  18062 0
-18059 -18060  18061 -966 -18063 0
-18059 -18060  18061 -966  18064 0

c  -1+1 --> 0
c    ( b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0 ∧  p_966) -> (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧ -b^{69, 15}_0)
c  in CNF:
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_2
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_1
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_0
c  in DIMACS:
-18059  18060 -18061 -966 -18062 0
-18059  18060 -18061 -966 -18063 0
-18059  18060 -18061 -966 -18064 0

c  0+1 --> 1
c    (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧  p_966) -> (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0)
c  in CNF:
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_2
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_1
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨  b^{69, 15}_0
c  in DIMACS:
 18059  18060  18061 -966 -18062 0
 18059  18060  18061 -966 -18063 0
 18059  18060  18061 -966  18064 0

c  1+1 --> 2
c    (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0 ∧  p_966) -> (-b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0)
c  in CNF:
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_2
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨  b^{69, 15}_1
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ -p_966 ∨ -b^{69, 15}_0
c  in DIMACS:
 18059  18060 -18061 -966 -18062 0
 18059  18060 -18061 -966  18063 0
 18059  18060 -18061 -966 -18064 0

c  2+1 --> break 
c    (-b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧  p_966) -> break
c  in CNF:
c     b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 18059 -18060  18061 -966 1162 0


c  2-1 --> 1
c    (-b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧ -p_966) -> (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0)
c  in CNF:
c     b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_2
c     b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_1
c     b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨  b^{69, 15}_0
c  in DIMACS:
 18059 -18060  18061  966 -18062 0
 18059 -18060  18061  966 -18063 0
 18059 -18060  18061  966  18064 0

c  1-1 --> 0
c    (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0 ∧ -p_966) -> (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧ -b^{69, 15}_0)
c  in CNF:
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_2
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_1
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_0
c  in DIMACS:
 18059  18060 -18061  966 -18062 0
 18059  18060 -18061  966 -18063 0
 18059  18060 -18061  966 -18064 0

c  0-1 --> -1
c    (-b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧ -p_966) -> ( b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0)
c  in CNF:
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨  b^{69, 15}_2
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_1
c     b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨  b^{69, 15}_0
c  in DIMACS:
 18059  18060  18061  966  18062 0
 18059  18060  18061  966 -18063 0
 18059  18060  18061  966  18064 0

c  -1-1 --> -2
c    ( b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧  b^{69, 14}_0 ∧ -p_966) -> ( b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0)
c  in CNF:
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨  b^{69, 15}_2
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨  b^{69, 15}_1
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨  p_966 ∨ -b^{69, 15}_0
c  in DIMACS:
-18059  18060 -18061  966  18062 0
-18059  18060 -18061  966  18063 0
-18059  18060 -18061  966 -18064 0

c  -2-1 --> break 
c    ( b^{69, 14}_2 ∧  b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨  b^{69, 14}_0 ∨  p_966 ∨ break
c  in DIMACS:
-18059 -18060  18061  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 14}_2 ∧ -b^{69, 14}_1 ∧ -b^{69, 14}_0 ∧ true) 
c  in CNF:
c    -b^{69, 14}_2 ∨  b^{69, 14}_1 ∨  b^{69, 14}_0 ∨ false 
c  in DIMACS:
-18059  18060  18061  0

c  3 does not represent an automaton state.
c    -(-b^{69, 14}_2 ∧  b^{69, 14}_1 ∧  b^{69, 14}_0 ∧ true) 
c  in CNF:
c     b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ false 
c  in DIMACS:
 18059 -18060 -18061  0
c  -3 does not represent an automaton state.
c    -( b^{69, 14}_2 ∧  b^{69, 14}_1 ∧  b^{69, 14}_0 ∧ true) 
c  in CNF:
c    -b^{69, 14}_2 ∨ -b^{69, 14}_1 ∨ -b^{69, 14}_0 ∨ false 
c  in DIMACS:
-18059 -18060 -18061  0

c i = 15
c  -2+1 --> -1
c    ( b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧  p_1035) -> ( b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0)
c  in CNF:
c    -b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨  b^{69, 16}_2
c    -b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_1
c    -b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨  b^{69, 16}_0
c  in DIMACS:
-18062 -18063  18064 -1035  18065 0
-18062 -18063  18064 -1035 -18066 0
-18062 -18063  18064 -1035  18067 0

c  -1+1 --> 0
c    ( b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0 ∧  p_1035) -> (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧ -b^{69, 16}_0)
c  in CNF:
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_2
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_1
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_0
c  in DIMACS:
-18062  18063 -18064 -1035 -18065 0
-18062  18063 -18064 -1035 -18066 0
-18062  18063 -18064 -1035 -18067 0

c  0+1 --> 1
c    (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧  p_1035) -> (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0)
c  in CNF:
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_2
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_1
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨  b^{69, 16}_0
c  in DIMACS:
 18062  18063  18064 -1035 -18065 0
 18062  18063  18064 -1035 -18066 0
 18062  18063  18064 -1035  18067 0

c  1+1 --> 2
c    (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0 ∧  p_1035) -> (-b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0)
c  in CNF:
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_2
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨  b^{69, 16}_1
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ -p_1035 ∨ -b^{69, 16}_0
c  in DIMACS:
 18062  18063 -18064 -1035 -18065 0
 18062  18063 -18064 -1035  18066 0
 18062  18063 -18064 -1035 -18067 0

c  2+1 --> break 
c    (-b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 18062 -18063  18064 -1035 1162 0


c  2-1 --> 1
c    (-b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧ -p_1035) -> (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0)
c  in CNF:
c     b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_2
c     b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_1
c     b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨  b^{69, 16}_0
c  in DIMACS:
 18062 -18063  18064  1035 -18065 0
 18062 -18063  18064  1035 -18066 0
 18062 -18063  18064  1035  18067 0

c  1-1 --> 0
c    (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0 ∧ -p_1035) -> (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧ -b^{69, 16}_0)
c  in CNF:
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_2
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_1
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_0
c  in DIMACS:
 18062  18063 -18064  1035 -18065 0
 18062  18063 -18064  1035 -18066 0
 18062  18063 -18064  1035 -18067 0

c  0-1 --> -1
c    (-b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧ -p_1035) -> ( b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0)
c  in CNF:
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨  b^{69, 16}_2
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_1
c     b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨  b^{69, 16}_0
c  in DIMACS:
 18062  18063  18064  1035  18065 0
 18062  18063  18064  1035 -18066 0
 18062  18063  18064  1035  18067 0

c  -1-1 --> -2
c    ( b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧  b^{69, 15}_0 ∧ -p_1035) -> ( b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0)
c  in CNF:
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨  b^{69, 16}_2
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨  b^{69, 16}_1
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨  p_1035 ∨ -b^{69, 16}_0
c  in DIMACS:
-18062  18063 -18064  1035  18065 0
-18062  18063 -18064  1035  18066 0
-18062  18063 -18064  1035 -18067 0

c  -2-1 --> break 
c    ( b^{69, 15}_2 ∧  b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨  b^{69, 15}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-18062 -18063  18064  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 15}_2 ∧ -b^{69, 15}_1 ∧ -b^{69, 15}_0 ∧ true) 
c  in CNF:
c    -b^{69, 15}_2 ∨  b^{69, 15}_1 ∨  b^{69, 15}_0 ∨ false 
c  in DIMACS:
-18062  18063  18064  0

c  3 does not represent an automaton state.
c    -(-b^{69, 15}_2 ∧  b^{69, 15}_1 ∧  b^{69, 15}_0 ∧ true) 
c  in CNF:
c     b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ false 
c  in DIMACS:
 18062 -18063 -18064  0
c  -3 does not represent an automaton state.
c    -( b^{69, 15}_2 ∧  b^{69, 15}_1 ∧  b^{69, 15}_0 ∧ true) 
c  in CNF:
c    -b^{69, 15}_2 ∨ -b^{69, 15}_1 ∨ -b^{69, 15}_0 ∨ false 
c  in DIMACS:
-18062 -18063 -18064  0

c i = 16
c  -2+1 --> -1
c    ( b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧  p_1104) -> ( b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧  b^{69, 17}_0)
c  in CNF:
c    -b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨  b^{69, 17}_2
c    -b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_1
c    -b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨  b^{69, 17}_0
c  in DIMACS:
-18065 -18066  18067 -1104  18068 0
-18065 -18066  18067 -1104 -18069 0
-18065 -18066  18067 -1104  18070 0

c  -1+1 --> 0
c    ( b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0 ∧  p_1104) -> (-b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧ -b^{69, 17}_0)
c  in CNF:
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_2
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_1
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_0
c  in DIMACS:
-18065  18066 -18067 -1104 -18068 0
-18065  18066 -18067 -1104 -18069 0
-18065  18066 -18067 -1104 -18070 0

c  0+1 --> 1
c    (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧  p_1104) -> (-b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧  b^{69, 17}_0)
c  in CNF:
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_2
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_1
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨  b^{69, 17}_0
c  in DIMACS:
 18065  18066  18067 -1104 -18068 0
 18065  18066  18067 -1104 -18069 0
 18065  18066  18067 -1104  18070 0

c  1+1 --> 2
c    (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0 ∧  p_1104) -> (-b^{69, 17}_2 ∧  b^{69, 17}_1 ∧ -b^{69, 17}_0)
c  in CNF:
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_2
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨  b^{69, 17}_1
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ -p_1104 ∨ -b^{69, 17}_0
c  in DIMACS:
 18065  18066 -18067 -1104 -18068 0
 18065  18066 -18067 -1104  18069 0
 18065  18066 -18067 -1104 -18070 0

c  2+1 --> break 
c    (-b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 18065 -18066  18067 -1104 1162 0


c  2-1 --> 1
c    (-b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧ -p_1104) -> (-b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧  b^{69, 17}_0)
c  in CNF:
c     b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_2
c     b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_1
c     b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨  b^{69, 17}_0
c  in DIMACS:
 18065 -18066  18067  1104 -18068 0
 18065 -18066  18067  1104 -18069 0
 18065 -18066  18067  1104  18070 0

c  1-1 --> 0
c    (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0 ∧ -p_1104) -> (-b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧ -b^{69, 17}_0)
c  in CNF:
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_2
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_1
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_0
c  in DIMACS:
 18065  18066 -18067  1104 -18068 0
 18065  18066 -18067  1104 -18069 0
 18065  18066 -18067  1104 -18070 0

c  0-1 --> -1
c    (-b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧ -p_1104) -> ( b^{69, 17}_2 ∧ -b^{69, 17}_1 ∧  b^{69, 17}_0)
c  in CNF:
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨  b^{69, 17}_2
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_1
c     b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨  b^{69, 17}_0
c  in DIMACS:
 18065  18066  18067  1104  18068 0
 18065  18066  18067  1104 -18069 0
 18065  18066  18067  1104  18070 0

c  -1-1 --> -2
c    ( b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧  b^{69, 16}_0 ∧ -p_1104) -> ( b^{69, 17}_2 ∧  b^{69, 17}_1 ∧ -b^{69, 17}_0)
c  in CNF:
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨  b^{69, 17}_2
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨  b^{69, 17}_1
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨  p_1104 ∨ -b^{69, 17}_0
c  in DIMACS:
-18065  18066 -18067  1104  18068 0
-18065  18066 -18067  1104  18069 0
-18065  18066 -18067  1104 -18070 0

c  -2-1 --> break 
c    ( b^{69, 16}_2 ∧  b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨  b^{69, 16}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-18065 -18066  18067  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{69, 16}_2 ∧ -b^{69, 16}_1 ∧ -b^{69, 16}_0 ∧ true) 
c  in CNF:
c    -b^{69, 16}_2 ∨  b^{69, 16}_1 ∨  b^{69, 16}_0 ∨ false 
c  in DIMACS:
-18065  18066  18067  0

c  3 does not represent an automaton state.
c    -(-b^{69, 16}_2 ∧  b^{69, 16}_1 ∧  b^{69, 16}_0 ∧ true) 
c  in CNF:
c     b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ false 
c  in DIMACS:
 18065 -18066 -18067  0
c  -3 does not represent an automaton state.
c    -( b^{69, 16}_2 ∧  b^{69, 16}_1 ∧  b^{69, 16}_0 ∧ true) 
c  in CNF:
c    -b^{69, 16}_2 ∨ -b^{69, 16}_1 ∨ -b^{69, 16}_0 ∨ false 
c  in DIMACS:
-18065 -18066 -18067  0

c INIT for k = 70
c    -b^{70, 1}_2
c    -b^{70, 1}_1
c    -b^{70, 1}_0
c  in DIMACS:
-18071 0
-18072 0
-18073 0

c Transitions for k = 70
c i = 1
c  -2+1 --> -1
c    ( b^{70, 1}_2 ∧  b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧  p_70) -> ( b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0)
c  in CNF:
c    -b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨  b^{70, 2}_2
c    -b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_1
c    -b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨  b^{70, 2}_0
c  in DIMACS:
-18071 -18072  18073 -70  18074 0
-18071 -18072  18073 -70 -18075 0
-18071 -18072  18073 -70  18076 0

c  -1+1 --> 0
c    ( b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧  b^{70, 1}_0 ∧  p_70) -> (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧ -b^{70, 2}_0)
c  in CNF:
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_2
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_1
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_0
c  in DIMACS:
-18071  18072 -18073 -70 -18074 0
-18071  18072 -18073 -70 -18075 0
-18071  18072 -18073 -70 -18076 0

c  0+1 --> 1
c    (-b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧  p_70) -> (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0)
c  in CNF:
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_2
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_1
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨  b^{70, 2}_0
c  in DIMACS:
 18071  18072  18073 -70 -18074 0
 18071  18072  18073 -70 -18075 0
 18071  18072  18073 -70  18076 0

c  1+1 --> 2
c    (-b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧  b^{70, 1}_0 ∧  p_70) -> (-b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0)
c  in CNF:
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_2
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨  b^{70, 2}_1
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ -p_70 ∨ -b^{70, 2}_0
c  in DIMACS:
 18071  18072 -18073 -70 -18074 0
 18071  18072 -18073 -70  18075 0
 18071  18072 -18073 -70 -18076 0

c  2+1 --> break 
c    (-b^{70, 1}_2 ∧  b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧  p_70) -> break
c  in CNF:
c     b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ -p_70 ∨ break
c  in DIMACS:
 18071 -18072  18073 -70 1162 0


c  2-1 --> 1
c    (-b^{70, 1}_2 ∧  b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧ -p_70) -> (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0)
c  in CNF:
c     b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_2
c     b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_1
c     b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨  b^{70, 2}_0
c  in DIMACS:
 18071 -18072  18073  70 -18074 0
 18071 -18072  18073  70 -18075 0
 18071 -18072  18073  70  18076 0

c  1-1 --> 0
c    (-b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧  b^{70, 1}_0 ∧ -p_70) -> (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧ -b^{70, 2}_0)
c  in CNF:
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_2
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_1
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_0
c  in DIMACS:
 18071  18072 -18073  70 -18074 0
 18071  18072 -18073  70 -18075 0
 18071  18072 -18073  70 -18076 0

c  0-1 --> -1
c    (-b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧ -p_70) -> ( b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0)
c  in CNF:
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨  b^{70, 2}_2
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_1
c     b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨  b^{70, 2}_0
c  in DIMACS:
 18071  18072  18073  70  18074 0
 18071  18072  18073  70 -18075 0
 18071  18072  18073  70  18076 0

c  -1-1 --> -2
c    ( b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧  b^{70, 1}_0 ∧ -p_70) -> ( b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0)
c  in CNF:
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨  b^{70, 2}_2
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨  b^{70, 2}_1
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨  p_70 ∨ -b^{70, 2}_0
c  in DIMACS:
-18071  18072 -18073  70  18074 0
-18071  18072 -18073  70  18075 0
-18071  18072 -18073  70 -18076 0

c  -2-1 --> break 
c    ( b^{70, 1}_2 ∧  b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧ -p_70) -> break
c  in CNF:
c    -b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨  b^{70, 1}_0 ∨  p_70 ∨ break
c  in DIMACS:
-18071 -18072  18073  70 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 1}_2 ∧ -b^{70, 1}_1 ∧ -b^{70, 1}_0 ∧ true) 
c  in CNF:
c    -b^{70, 1}_2 ∨  b^{70, 1}_1 ∨  b^{70, 1}_0 ∨ false 
c  in DIMACS:
-18071  18072  18073  0

c  3 does not represent an automaton state.
c    -(-b^{70, 1}_2 ∧  b^{70, 1}_1 ∧  b^{70, 1}_0 ∧ true) 
c  in CNF:
c     b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ false 
c  in DIMACS:
 18071 -18072 -18073  0
c  -3 does not represent an automaton state.
c    -( b^{70, 1}_2 ∧  b^{70, 1}_1 ∧  b^{70, 1}_0 ∧ true) 
c  in CNF:
c    -b^{70, 1}_2 ∨ -b^{70, 1}_1 ∨ -b^{70, 1}_0 ∨ false 
c  in DIMACS:
-18071 -18072 -18073  0

c i = 2
c  -2+1 --> -1
c    ( b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧  p_140) -> ( b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0)
c  in CNF:
c    -b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨  b^{70, 3}_2
c    -b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_1
c    -b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨  b^{70, 3}_0
c  in DIMACS:
-18074 -18075  18076 -140  18077 0
-18074 -18075  18076 -140 -18078 0
-18074 -18075  18076 -140  18079 0

c  -1+1 --> 0
c    ( b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0 ∧  p_140) -> (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧ -b^{70, 3}_0)
c  in CNF:
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_2
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_1
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_0
c  in DIMACS:
-18074  18075 -18076 -140 -18077 0
-18074  18075 -18076 -140 -18078 0
-18074  18075 -18076 -140 -18079 0

c  0+1 --> 1
c    (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧  p_140) -> (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0)
c  in CNF:
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_2
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_1
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨  b^{70, 3}_0
c  in DIMACS:
 18074  18075  18076 -140 -18077 0
 18074  18075  18076 -140 -18078 0
 18074  18075  18076 -140  18079 0

c  1+1 --> 2
c    (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0 ∧  p_140) -> (-b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0)
c  in CNF:
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_2
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨  b^{70, 3}_1
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ -p_140 ∨ -b^{70, 3}_0
c  in DIMACS:
 18074  18075 -18076 -140 -18077 0
 18074  18075 -18076 -140  18078 0
 18074  18075 -18076 -140 -18079 0

c  2+1 --> break 
c    (-b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧  p_140) -> break
c  in CNF:
c     b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 18074 -18075  18076 -140 1162 0


c  2-1 --> 1
c    (-b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧ -p_140) -> (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0)
c  in CNF:
c     b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_2
c     b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_1
c     b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨  b^{70, 3}_0
c  in DIMACS:
 18074 -18075  18076  140 -18077 0
 18074 -18075  18076  140 -18078 0
 18074 -18075  18076  140  18079 0

c  1-1 --> 0
c    (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0 ∧ -p_140) -> (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧ -b^{70, 3}_0)
c  in CNF:
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_2
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_1
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_0
c  in DIMACS:
 18074  18075 -18076  140 -18077 0
 18074  18075 -18076  140 -18078 0
 18074  18075 -18076  140 -18079 0

c  0-1 --> -1
c    (-b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧ -p_140) -> ( b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0)
c  in CNF:
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨  b^{70, 3}_2
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_1
c     b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨  b^{70, 3}_0
c  in DIMACS:
 18074  18075  18076  140  18077 0
 18074  18075  18076  140 -18078 0
 18074  18075  18076  140  18079 0

c  -1-1 --> -2
c    ( b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧  b^{70, 2}_0 ∧ -p_140) -> ( b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0)
c  in CNF:
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨  b^{70, 3}_2
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨  b^{70, 3}_1
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨  p_140 ∨ -b^{70, 3}_0
c  in DIMACS:
-18074  18075 -18076  140  18077 0
-18074  18075 -18076  140  18078 0
-18074  18075 -18076  140 -18079 0

c  -2-1 --> break 
c    ( b^{70, 2}_2 ∧  b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨  b^{70, 2}_0 ∨  p_140 ∨ break
c  in DIMACS:
-18074 -18075  18076  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 2}_2 ∧ -b^{70, 2}_1 ∧ -b^{70, 2}_0 ∧ true) 
c  in CNF:
c    -b^{70, 2}_2 ∨  b^{70, 2}_1 ∨  b^{70, 2}_0 ∨ false 
c  in DIMACS:
-18074  18075  18076  0

c  3 does not represent an automaton state.
c    -(-b^{70, 2}_2 ∧  b^{70, 2}_1 ∧  b^{70, 2}_0 ∧ true) 
c  in CNF:
c     b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ false 
c  in DIMACS:
 18074 -18075 -18076  0
c  -3 does not represent an automaton state.
c    -( b^{70, 2}_2 ∧  b^{70, 2}_1 ∧  b^{70, 2}_0 ∧ true) 
c  in CNF:
c    -b^{70, 2}_2 ∨ -b^{70, 2}_1 ∨ -b^{70, 2}_0 ∨ false 
c  in DIMACS:
-18074 -18075 -18076  0

c i = 3
c  -2+1 --> -1
c    ( b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧  p_210) -> ( b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0)
c  in CNF:
c    -b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨  b^{70, 4}_2
c    -b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_1
c    -b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨  b^{70, 4}_0
c  in DIMACS:
-18077 -18078  18079 -210  18080 0
-18077 -18078  18079 -210 -18081 0
-18077 -18078  18079 -210  18082 0

c  -1+1 --> 0
c    ( b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0 ∧  p_210) -> (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧ -b^{70, 4}_0)
c  in CNF:
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_2
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_1
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_0
c  in DIMACS:
-18077  18078 -18079 -210 -18080 0
-18077  18078 -18079 -210 -18081 0
-18077  18078 -18079 -210 -18082 0

c  0+1 --> 1
c    (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧  p_210) -> (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0)
c  in CNF:
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_2
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_1
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨  b^{70, 4}_0
c  in DIMACS:
 18077  18078  18079 -210 -18080 0
 18077  18078  18079 -210 -18081 0
 18077  18078  18079 -210  18082 0

c  1+1 --> 2
c    (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0 ∧  p_210) -> (-b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0)
c  in CNF:
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_2
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨  b^{70, 4}_1
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ -p_210 ∨ -b^{70, 4}_0
c  in DIMACS:
 18077  18078 -18079 -210 -18080 0
 18077  18078 -18079 -210  18081 0
 18077  18078 -18079 -210 -18082 0

c  2+1 --> break 
c    (-b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧  p_210) -> break
c  in CNF:
c     b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 18077 -18078  18079 -210 1162 0


c  2-1 --> 1
c    (-b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧ -p_210) -> (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0)
c  in CNF:
c     b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_2
c     b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_1
c     b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨  b^{70, 4}_0
c  in DIMACS:
 18077 -18078  18079  210 -18080 0
 18077 -18078  18079  210 -18081 0
 18077 -18078  18079  210  18082 0

c  1-1 --> 0
c    (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0 ∧ -p_210) -> (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧ -b^{70, 4}_0)
c  in CNF:
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_2
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_1
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_0
c  in DIMACS:
 18077  18078 -18079  210 -18080 0
 18077  18078 -18079  210 -18081 0
 18077  18078 -18079  210 -18082 0

c  0-1 --> -1
c    (-b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧ -p_210) -> ( b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0)
c  in CNF:
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨  b^{70, 4}_2
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_1
c     b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨  b^{70, 4}_0
c  in DIMACS:
 18077  18078  18079  210  18080 0
 18077  18078  18079  210 -18081 0
 18077  18078  18079  210  18082 0

c  -1-1 --> -2
c    ( b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧  b^{70, 3}_0 ∧ -p_210) -> ( b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0)
c  in CNF:
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨  b^{70, 4}_2
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨  b^{70, 4}_1
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨  p_210 ∨ -b^{70, 4}_0
c  in DIMACS:
-18077  18078 -18079  210  18080 0
-18077  18078 -18079  210  18081 0
-18077  18078 -18079  210 -18082 0

c  -2-1 --> break 
c    ( b^{70, 3}_2 ∧  b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨  b^{70, 3}_0 ∨  p_210 ∨ break
c  in DIMACS:
-18077 -18078  18079  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 3}_2 ∧ -b^{70, 3}_1 ∧ -b^{70, 3}_0 ∧ true) 
c  in CNF:
c    -b^{70, 3}_2 ∨  b^{70, 3}_1 ∨  b^{70, 3}_0 ∨ false 
c  in DIMACS:
-18077  18078  18079  0

c  3 does not represent an automaton state.
c    -(-b^{70, 3}_2 ∧  b^{70, 3}_1 ∧  b^{70, 3}_0 ∧ true) 
c  in CNF:
c     b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ false 
c  in DIMACS:
 18077 -18078 -18079  0
c  -3 does not represent an automaton state.
c    -( b^{70, 3}_2 ∧  b^{70, 3}_1 ∧  b^{70, 3}_0 ∧ true) 
c  in CNF:
c    -b^{70, 3}_2 ∨ -b^{70, 3}_1 ∨ -b^{70, 3}_0 ∨ false 
c  in DIMACS:
-18077 -18078 -18079  0

c i = 4
c  -2+1 --> -1
c    ( b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧  p_280) -> ( b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0)
c  in CNF:
c    -b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨  b^{70, 5}_2
c    -b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_1
c    -b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨  b^{70, 5}_0
c  in DIMACS:
-18080 -18081  18082 -280  18083 0
-18080 -18081  18082 -280 -18084 0
-18080 -18081  18082 -280  18085 0

c  -1+1 --> 0
c    ( b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0 ∧  p_280) -> (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧ -b^{70, 5}_0)
c  in CNF:
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_2
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_1
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_0
c  in DIMACS:
-18080  18081 -18082 -280 -18083 0
-18080  18081 -18082 -280 -18084 0
-18080  18081 -18082 -280 -18085 0

c  0+1 --> 1
c    (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧  p_280) -> (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0)
c  in CNF:
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_2
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_1
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨  b^{70, 5}_0
c  in DIMACS:
 18080  18081  18082 -280 -18083 0
 18080  18081  18082 -280 -18084 0
 18080  18081  18082 -280  18085 0

c  1+1 --> 2
c    (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0 ∧  p_280) -> (-b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0)
c  in CNF:
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_2
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨  b^{70, 5}_1
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ -p_280 ∨ -b^{70, 5}_0
c  in DIMACS:
 18080  18081 -18082 -280 -18083 0
 18080  18081 -18082 -280  18084 0
 18080  18081 -18082 -280 -18085 0

c  2+1 --> break 
c    (-b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧  p_280) -> break
c  in CNF:
c     b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 18080 -18081  18082 -280 1162 0


c  2-1 --> 1
c    (-b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧ -p_280) -> (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0)
c  in CNF:
c     b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_2
c     b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_1
c     b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨  b^{70, 5}_0
c  in DIMACS:
 18080 -18081  18082  280 -18083 0
 18080 -18081  18082  280 -18084 0
 18080 -18081  18082  280  18085 0

c  1-1 --> 0
c    (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0 ∧ -p_280) -> (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧ -b^{70, 5}_0)
c  in CNF:
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_2
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_1
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_0
c  in DIMACS:
 18080  18081 -18082  280 -18083 0
 18080  18081 -18082  280 -18084 0
 18080  18081 -18082  280 -18085 0

c  0-1 --> -1
c    (-b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧ -p_280) -> ( b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0)
c  in CNF:
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨  b^{70, 5}_2
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_1
c     b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨  b^{70, 5}_0
c  in DIMACS:
 18080  18081  18082  280  18083 0
 18080  18081  18082  280 -18084 0
 18080  18081  18082  280  18085 0

c  -1-1 --> -2
c    ( b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧  b^{70, 4}_0 ∧ -p_280) -> ( b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0)
c  in CNF:
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨  b^{70, 5}_2
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨  b^{70, 5}_1
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨  p_280 ∨ -b^{70, 5}_0
c  in DIMACS:
-18080  18081 -18082  280  18083 0
-18080  18081 -18082  280  18084 0
-18080  18081 -18082  280 -18085 0

c  -2-1 --> break 
c    ( b^{70, 4}_2 ∧  b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨  b^{70, 4}_0 ∨  p_280 ∨ break
c  in DIMACS:
-18080 -18081  18082  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 4}_2 ∧ -b^{70, 4}_1 ∧ -b^{70, 4}_0 ∧ true) 
c  in CNF:
c    -b^{70, 4}_2 ∨  b^{70, 4}_1 ∨  b^{70, 4}_0 ∨ false 
c  in DIMACS:
-18080  18081  18082  0

c  3 does not represent an automaton state.
c    -(-b^{70, 4}_2 ∧  b^{70, 4}_1 ∧  b^{70, 4}_0 ∧ true) 
c  in CNF:
c     b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ false 
c  in DIMACS:
 18080 -18081 -18082  0
c  -3 does not represent an automaton state.
c    -( b^{70, 4}_2 ∧  b^{70, 4}_1 ∧  b^{70, 4}_0 ∧ true) 
c  in CNF:
c    -b^{70, 4}_2 ∨ -b^{70, 4}_1 ∨ -b^{70, 4}_0 ∨ false 
c  in DIMACS:
-18080 -18081 -18082  0

c i = 5
c  -2+1 --> -1
c    ( b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧  p_350) -> ( b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0)
c  in CNF:
c    -b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨  b^{70, 6}_2
c    -b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_1
c    -b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨  b^{70, 6}_0
c  in DIMACS:
-18083 -18084  18085 -350  18086 0
-18083 -18084  18085 -350 -18087 0
-18083 -18084  18085 -350  18088 0

c  -1+1 --> 0
c    ( b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0 ∧  p_350) -> (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧ -b^{70, 6}_0)
c  in CNF:
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_2
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_1
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_0
c  in DIMACS:
-18083  18084 -18085 -350 -18086 0
-18083  18084 -18085 -350 -18087 0
-18083  18084 -18085 -350 -18088 0

c  0+1 --> 1
c    (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧  p_350) -> (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0)
c  in CNF:
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_2
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_1
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨  b^{70, 6}_0
c  in DIMACS:
 18083  18084  18085 -350 -18086 0
 18083  18084  18085 -350 -18087 0
 18083  18084  18085 -350  18088 0

c  1+1 --> 2
c    (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0 ∧  p_350) -> (-b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0)
c  in CNF:
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_2
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨  b^{70, 6}_1
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ -p_350 ∨ -b^{70, 6}_0
c  in DIMACS:
 18083  18084 -18085 -350 -18086 0
 18083  18084 -18085 -350  18087 0
 18083  18084 -18085 -350 -18088 0

c  2+1 --> break 
c    (-b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧  p_350) -> break
c  in CNF:
c     b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 18083 -18084  18085 -350 1162 0


c  2-1 --> 1
c    (-b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧ -p_350) -> (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0)
c  in CNF:
c     b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_2
c     b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_1
c     b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨  b^{70, 6}_0
c  in DIMACS:
 18083 -18084  18085  350 -18086 0
 18083 -18084  18085  350 -18087 0
 18083 -18084  18085  350  18088 0

c  1-1 --> 0
c    (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0 ∧ -p_350) -> (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧ -b^{70, 6}_0)
c  in CNF:
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_2
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_1
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_0
c  in DIMACS:
 18083  18084 -18085  350 -18086 0
 18083  18084 -18085  350 -18087 0
 18083  18084 -18085  350 -18088 0

c  0-1 --> -1
c    (-b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧ -p_350) -> ( b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0)
c  in CNF:
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨  b^{70, 6}_2
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_1
c     b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨  b^{70, 6}_0
c  in DIMACS:
 18083  18084  18085  350  18086 0
 18083  18084  18085  350 -18087 0
 18083  18084  18085  350  18088 0

c  -1-1 --> -2
c    ( b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧  b^{70, 5}_0 ∧ -p_350) -> ( b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0)
c  in CNF:
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨  b^{70, 6}_2
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨  b^{70, 6}_1
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨  p_350 ∨ -b^{70, 6}_0
c  in DIMACS:
-18083  18084 -18085  350  18086 0
-18083  18084 -18085  350  18087 0
-18083  18084 -18085  350 -18088 0

c  -2-1 --> break 
c    ( b^{70, 5}_2 ∧  b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨  b^{70, 5}_0 ∨  p_350 ∨ break
c  in DIMACS:
-18083 -18084  18085  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 5}_2 ∧ -b^{70, 5}_1 ∧ -b^{70, 5}_0 ∧ true) 
c  in CNF:
c    -b^{70, 5}_2 ∨  b^{70, 5}_1 ∨  b^{70, 5}_0 ∨ false 
c  in DIMACS:
-18083  18084  18085  0

c  3 does not represent an automaton state.
c    -(-b^{70, 5}_2 ∧  b^{70, 5}_1 ∧  b^{70, 5}_0 ∧ true) 
c  in CNF:
c     b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ false 
c  in DIMACS:
 18083 -18084 -18085  0
c  -3 does not represent an automaton state.
c    -( b^{70, 5}_2 ∧  b^{70, 5}_1 ∧  b^{70, 5}_0 ∧ true) 
c  in CNF:
c    -b^{70, 5}_2 ∨ -b^{70, 5}_1 ∨ -b^{70, 5}_0 ∨ false 
c  in DIMACS:
-18083 -18084 -18085  0

c i = 6
c  -2+1 --> -1
c    ( b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧  p_420) -> ( b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0)
c  in CNF:
c    -b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨  b^{70, 7}_2
c    -b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_1
c    -b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨  b^{70, 7}_0
c  in DIMACS:
-18086 -18087  18088 -420  18089 0
-18086 -18087  18088 -420 -18090 0
-18086 -18087  18088 -420  18091 0

c  -1+1 --> 0
c    ( b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0 ∧  p_420) -> (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧ -b^{70, 7}_0)
c  in CNF:
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_2
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_1
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_0
c  in DIMACS:
-18086  18087 -18088 -420 -18089 0
-18086  18087 -18088 -420 -18090 0
-18086  18087 -18088 -420 -18091 0

c  0+1 --> 1
c    (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧  p_420) -> (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0)
c  in CNF:
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_2
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_1
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨  b^{70, 7}_0
c  in DIMACS:
 18086  18087  18088 -420 -18089 0
 18086  18087  18088 -420 -18090 0
 18086  18087  18088 -420  18091 0

c  1+1 --> 2
c    (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0 ∧  p_420) -> (-b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0)
c  in CNF:
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_2
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨  b^{70, 7}_1
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ -p_420 ∨ -b^{70, 7}_0
c  in DIMACS:
 18086  18087 -18088 -420 -18089 0
 18086  18087 -18088 -420  18090 0
 18086  18087 -18088 -420 -18091 0

c  2+1 --> break 
c    (-b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧  p_420) -> break
c  in CNF:
c     b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 18086 -18087  18088 -420 1162 0


c  2-1 --> 1
c    (-b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧ -p_420) -> (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0)
c  in CNF:
c     b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_2
c     b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_1
c     b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨  b^{70, 7}_0
c  in DIMACS:
 18086 -18087  18088  420 -18089 0
 18086 -18087  18088  420 -18090 0
 18086 -18087  18088  420  18091 0

c  1-1 --> 0
c    (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0 ∧ -p_420) -> (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧ -b^{70, 7}_0)
c  in CNF:
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_2
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_1
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_0
c  in DIMACS:
 18086  18087 -18088  420 -18089 0
 18086  18087 -18088  420 -18090 0
 18086  18087 -18088  420 -18091 0

c  0-1 --> -1
c    (-b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧ -p_420) -> ( b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0)
c  in CNF:
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨  b^{70, 7}_2
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_1
c     b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨  b^{70, 7}_0
c  in DIMACS:
 18086  18087  18088  420  18089 0
 18086  18087  18088  420 -18090 0
 18086  18087  18088  420  18091 0

c  -1-1 --> -2
c    ( b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧  b^{70, 6}_0 ∧ -p_420) -> ( b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0)
c  in CNF:
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨  b^{70, 7}_2
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨  b^{70, 7}_1
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨  p_420 ∨ -b^{70, 7}_0
c  in DIMACS:
-18086  18087 -18088  420  18089 0
-18086  18087 -18088  420  18090 0
-18086  18087 -18088  420 -18091 0

c  -2-1 --> break 
c    ( b^{70, 6}_2 ∧  b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨  b^{70, 6}_0 ∨  p_420 ∨ break
c  in DIMACS:
-18086 -18087  18088  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 6}_2 ∧ -b^{70, 6}_1 ∧ -b^{70, 6}_0 ∧ true) 
c  in CNF:
c    -b^{70, 6}_2 ∨  b^{70, 6}_1 ∨  b^{70, 6}_0 ∨ false 
c  in DIMACS:
-18086  18087  18088  0

c  3 does not represent an automaton state.
c    -(-b^{70, 6}_2 ∧  b^{70, 6}_1 ∧  b^{70, 6}_0 ∧ true) 
c  in CNF:
c     b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ false 
c  in DIMACS:
 18086 -18087 -18088  0
c  -3 does not represent an automaton state.
c    -( b^{70, 6}_2 ∧  b^{70, 6}_1 ∧  b^{70, 6}_0 ∧ true) 
c  in CNF:
c    -b^{70, 6}_2 ∨ -b^{70, 6}_1 ∨ -b^{70, 6}_0 ∨ false 
c  in DIMACS:
-18086 -18087 -18088  0

c i = 7
c  -2+1 --> -1
c    ( b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧  p_490) -> ( b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0)
c  in CNF:
c    -b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨  b^{70, 8}_2
c    -b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_1
c    -b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨  b^{70, 8}_0
c  in DIMACS:
-18089 -18090  18091 -490  18092 0
-18089 -18090  18091 -490 -18093 0
-18089 -18090  18091 -490  18094 0

c  -1+1 --> 0
c    ( b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0 ∧  p_490) -> (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧ -b^{70, 8}_0)
c  in CNF:
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_2
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_1
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_0
c  in DIMACS:
-18089  18090 -18091 -490 -18092 0
-18089  18090 -18091 -490 -18093 0
-18089  18090 -18091 -490 -18094 0

c  0+1 --> 1
c    (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧  p_490) -> (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0)
c  in CNF:
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_2
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_1
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨  b^{70, 8}_0
c  in DIMACS:
 18089  18090  18091 -490 -18092 0
 18089  18090  18091 -490 -18093 0
 18089  18090  18091 -490  18094 0

c  1+1 --> 2
c    (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0 ∧  p_490) -> (-b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0)
c  in CNF:
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_2
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨  b^{70, 8}_1
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ -p_490 ∨ -b^{70, 8}_0
c  in DIMACS:
 18089  18090 -18091 -490 -18092 0
 18089  18090 -18091 -490  18093 0
 18089  18090 -18091 -490 -18094 0

c  2+1 --> break 
c    (-b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧  p_490) -> break
c  in CNF:
c     b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 18089 -18090  18091 -490 1162 0


c  2-1 --> 1
c    (-b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧ -p_490) -> (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0)
c  in CNF:
c     b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_2
c     b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_1
c     b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨  b^{70, 8}_0
c  in DIMACS:
 18089 -18090  18091  490 -18092 0
 18089 -18090  18091  490 -18093 0
 18089 -18090  18091  490  18094 0

c  1-1 --> 0
c    (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0 ∧ -p_490) -> (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧ -b^{70, 8}_0)
c  in CNF:
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_2
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_1
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_0
c  in DIMACS:
 18089  18090 -18091  490 -18092 0
 18089  18090 -18091  490 -18093 0
 18089  18090 -18091  490 -18094 0

c  0-1 --> -1
c    (-b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧ -p_490) -> ( b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0)
c  in CNF:
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨  b^{70, 8}_2
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_1
c     b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨  b^{70, 8}_0
c  in DIMACS:
 18089  18090  18091  490  18092 0
 18089  18090  18091  490 -18093 0
 18089  18090  18091  490  18094 0

c  -1-1 --> -2
c    ( b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧  b^{70, 7}_0 ∧ -p_490) -> ( b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0)
c  in CNF:
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨  b^{70, 8}_2
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨  b^{70, 8}_1
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨  p_490 ∨ -b^{70, 8}_0
c  in DIMACS:
-18089  18090 -18091  490  18092 0
-18089  18090 -18091  490  18093 0
-18089  18090 -18091  490 -18094 0

c  -2-1 --> break 
c    ( b^{70, 7}_2 ∧  b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨  b^{70, 7}_0 ∨  p_490 ∨ break
c  in DIMACS:
-18089 -18090  18091  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 7}_2 ∧ -b^{70, 7}_1 ∧ -b^{70, 7}_0 ∧ true) 
c  in CNF:
c    -b^{70, 7}_2 ∨  b^{70, 7}_1 ∨  b^{70, 7}_0 ∨ false 
c  in DIMACS:
-18089  18090  18091  0

c  3 does not represent an automaton state.
c    -(-b^{70, 7}_2 ∧  b^{70, 7}_1 ∧  b^{70, 7}_0 ∧ true) 
c  in CNF:
c     b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ false 
c  in DIMACS:
 18089 -18090 -18091  0
c  -3 does not represent an automaton state.
c    -( b^{70, 7}_2 ∧  b^{70, 7}_1 ∧  b^{70, 7}_0 ∧ true) 
c  in CNF:
c    -b^{70, 7}_2 ∨ -b^{70, 7}_1 ∨ -b^{70, 7}_0 ∨ false 
c  in DIMACS:
-18089 -18090 -18091  0

c i = 8
c  -2+1 --> -1
c    ( b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧  p_560) -> ( b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0)
c  in CNF:
c    -b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨  b^{70, 9}_2
c    -b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_1
c    -b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨  b^{70, 9}_0
c  in DIMACS:
-18092 -18093  18094 -560  18095 0
-18092 -18093  18094 -560 -18096 0
-18092 -18093  18094 -560  18097 0

c  -1+1 --> 0
c    ( b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0 ∧  p_560) -> (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧ -b^{70, 9}_0)
c  in CNF:
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_2
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_1
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_0
c  in DIMACS:
-18092  18093 -18094 -560 -18095 0
-18092  18093 -18094 -560 -18096 0
-18092  18093 -18094 -560 -18097 0

c  0+1 --> 1
c    (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧  p_560) -> (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0)
c  in CNF:
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_2
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_1
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨  b^{70, 9}_0
c  in DIMACS:
 18092  18093  18094 -560 -18095 0
 18092  18093  18094 -560 -18096 0
 18092  18093  18094 -560  18097 0

c  1+1 --> 2
c    (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0 ∧  p_560) -> (-b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0)
c  in CNF:
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_2
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨  b^{70, 9}_1
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ -p_560 ∨ -b^{70, 9}_0
c  in DIMACS:
 18092  18093 -18094 -560 -18095 0
 18092  18093 -18094 -560  18096 0
 18092  18093 -18094 -560 -18097 0

c  2+1 --> break 
c    (-b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧  p_560) -> break
c  in CNF:
c     b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 18092 -18093  18094 -560 1162 0


c  2-1 --> 1
c    (-b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧ -p_560) -> (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0)
c  in CNF:
c     b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_2
c     b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_1
c     b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨  b^{70, 9}_0
c  in DIMACS:
 18092 -18093  18094  560 -18095 0
 18092 -18093  18094  560 -18096 0
 18092 -18093  18094  560  18097 0

c  1-1 --> 0
c    (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0 ∧ -p_560) -> (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧ -b^{70, 9}_0)
c  in CNF:
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_2
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_1
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_0
c  in DIMACS:
 18092  18093 -18094  560 -18095 0
 18092  18093 -18094  560 -18096 0
 18092  18093 -18094  560 -18097 0

c  0-1 --> -1
c    (-b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧ -p_560) -> ( b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0)
c  in CNF:
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨  b^{70, 9}_2
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_1
c     b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨  b^{70, 9}_0
c  in DIMACS:
 18092  18093  18094  560  18095 0
 18092  18093  18094  560 -18096 0
 18092  18093  18094  560  18097 0

c  -1-1 --> -2
c    ( b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧  b^{70, 8}_0 ∧ -p_560) -> ( b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0)
c  in CNF:
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨  b^{70, 9}_2
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨  b^{70, 9}_1
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨  p_560 ∨ -b^{70, 9}_0
c  in DIMACS:
-18092  18093 -18094  560  18095 0
-18092  18093 -18094  560  18096 0
-18092  18093 -18094  560 -18097 0

c  -2-1 --> break 
c    ( b^{70, 8}_2 ∧  b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨  b^{70, 8}_0 ∨  p_560 ∨ break
c  in DIMACS:
-18092 -18093  18094  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 8}_2 ∧ -b^{70, 8}_1 ∧ -b^{70, 8}_0 ∧ true) 
c  in CNF:
c    -b^{70, 8}_2 ∨  b^{70, 8}_1 ∨  b^{70, 8}_0 ∨ false 
c  in DIMACS:
-18092  18093  18094  0

c  3 does not represent an automaton state.
c    -(-b^{70, 8}_2 ∧  b^{70, 8}_1 ∧  b^{70, 8}_0 ∧ true) 
c  in CNF:
c     b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ false 
c  in DIMACS:
 18092 -18093 -18094  0
c  -3 does not represent an automaton state.
c    -( b^{70, 8}_2 ∧  b^{70, 8}_1 ∧  b^{70, 8}_0 ∧ true) 
c  in CNF:
c    -b^{70, 8}_2 ∨ -b^{70, 8}_1 ∨ -b^{70, 8}_0 ∨ false 
c  in DIMACS:
-18092 -18093 -18094  0

c i = 9
c  -2+1 --> -1
c    ( b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧  p_630) -> ( b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0)
c  in CNF:
c    -b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨  b^{70, 10}_2
c    -b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_1
c    -b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨  b^{70, 10}_0
c  in DIMACS:
-18095 -18096  18097 -630  18098 0
-18095 -18096  18097 -630 -18099 0
-18095 -18096  18097 -630  18100 0

c  -1+1 --> 0
c    ( b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0 ∧  p_630) -> (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧ -b^{70, 10}_0)
c  in CNF:
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_2
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_1
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_0
c  in DIMACS:
-18095  18096 -18097 -630 -18098 0
-18095  18096 -18097 -630 -18099 0
-18095  18096 -18097 -630 -18100 0

c  0+1 --> 1
c    (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧  p_630) -> (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0)
c  in CNF:
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_2
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_1
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨  b^{70, 10}_0
c  in DIMACS:
 18095  18096  18097 -630 -18098 0
 18095  18096  18097 -630 -18099 0
 18095  18096  18097 -630  18100 0

c  1+1 --> 2
c    (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0 ∧  p_630) -> (-b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0)
c  in CNF:
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_2
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨  b^{70, 10}_1
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ -p_630 ∨ -b^{70, 10}_0
c  in DIMACS:
 18095  18096 -18097 -630 -18098 0
 18095  18096 -18097 -630  18099 0
 18095  18096 -18097 -630 -18100 0

c  2+1 --> break 
c    (-b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧  p_630) -> break
c  in CNF:
c     b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 18095 -18096  18097 -630 1162 0


c  2-1 --> 1
c    (-b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧ -p_630) -> (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0)
c  in CNF:
c     b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_2
c     b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_1
c     b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨  b^{70, 10}_0
c  in DIMACS:
 18095 -18096  18097  630 -18098 0
 18095 -18096  18097  630 -18099 0
 18095 -18096  18097  630  18100 0

c  1-1 --> 0
c    (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0 ∧ -p_630) -> (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧ -b^{70, 10}_0)
c  in CNF:
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_2
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_1
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_0
c  in DIMACS:
 18095  18096 -18097  630 -18098 0
 18095  18096 -18097  630 -18099 0
 18095  18096 -18097  630 -18100 0

c  0-1 --> -1
c    (-b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧ -p_630) -> ( b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0)
c  in CNF:
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨  b^{70, 10}_2
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_1
c     b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨  b^{70, 10}_0
c  in DIMACS:
 18095  18096  18097  630  18098 0
 18095  18096  18097  630 -18099 0
 18095  18096  18097  630  18100 0

c  -1-1 --> -2
c    ( b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧  b^{70, 9}_0 ∧ -p_630) -> ( b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0)
c  in CNF:
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨  b^{70, 10}_2
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨  b^{70, 10}_1
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨  p_630 ∨ -b^{70, 10}_0
c  in DIMACS:
-18095  18096 -18097  630  18098 0
-18095  18096 -18097  630  18099 0
-18095  18096 -18097  630 -18100 0

c  -2-1 --> break 
c    ( b^{70, 9}_2 ∧  b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨  b^{70, 9}_0 ∨  p_630 ∨ break
c  in DIMACS:
-18095 -18096  18097  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 9}_2 ∧ -b^{70, 9}_1 ∧ -b^{70, 9}_0 ∧ true) 
c  in CNF:
c    -b^{70, 9}_2 ∨  b^{70, 9}_1 ∨  b^{70, 9}_0 ∨ false 
c  in DIMACS:
-18095  18096  18097  0

c  3 does not represent an automaton state.
c    -(-b^{70, 9}_2 ∧  b^{70, 9}_1 ∧  b^{70, 9}_0 ∧ true) 
c  in CNF:
c     b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ false 
c  in DIMACS:
 18095 -18096 -18097  0
c  -3 does not represent an automaton state.
c    -( b^{70, 9}_2 ∧  b^{70, 9}_1 ∧  b^{70, 9}_0 ∧ true) 
c  in CNF:
c    -b^{70, 9}_2 ∨ -b^{70, 9}_1 ∨ -b^{70, 9}_0 ∨ false 
c  in DIMACS:
-18095 -18096 -18097  0

c i = 10
c  -2+1 --> -1
c    ( b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧  p_700) -> ( b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0)
c  in CNF:
c    -b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨  b^{70, 11}_2
c    -b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_1
c    -b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨  b^{70, 11}_0
c  in DIMACS:
-18098 -18099  18100 -700  18101 0
-18098 -18099  18100 -700 -18102 0
-18098 -18099  18100 -700  18103 0

c  -1+1 --> 0
c    ( b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0 ∧  p_700) -> (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧ -b^{70, 11}_0)
c  in CNF:
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_2
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_1
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_0
c  in DIMACS:
-18098  18099 -18100 -700 -18101 0
-18098  18099 -18100 -700 -18102 0
-18098  18099 -18100 -700 -18103 0

c  0+1 --> 1
c    (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧  p_700) -> (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0)
c  in CNF:
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_2
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_1
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨  b^{70, 11}_0
c  in DIMACS:
 18098  18099  18100 -700 -18101 0
 18098  18099  18100 -700 -18102 0
 18098  18099  18100 -700  18103 0

c  1+1 --> 2
c    (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0 ∧  p_700) -> (-b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0)
c  in CNF:
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_2
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨  b^{70, 11}_1
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ -p_700 ∨ -b^{70, 11}_0
c  in DIMACS:
 18098  18099 -18100 -700 -18101 0
 18098  18099 -18100 -700  18102 0
 18098  18099 -18100 -700 -18103 0

c  2+1 --> break 
c    (-b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧  p_700) -> break
c  in CNF:
c     b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 18098 -18099  18100 -700 1162 0


c  2-1 --> 1
c    (-b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧ -p_700) -> (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0)
c  in CNF:
c     b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_2
c     b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_1
c     b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨  b^{70, 11}_0
c  in DIMACS:
 18098 -18099  18100  700 -18101 0
 18098 -18099  18100  700 -18102 0
 18098 -18099  18100  700  18103 0

c  1-1 --> 0
c    (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0 ∧ -p_700) -> (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧ -b^{70, 11}_0)
c  in CNF:
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_2
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_1
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_0
c  in DIMACS:
 18098  18099 -18100  700 -18101 0
 18098  18099 -18100  700 -18102 0
 18098  18099 -18100  700 -18103 0

c  0-1 --> -1
c    (-b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧ -p_700) -> ( b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0)
c  in CNF:
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨  b^{70, 11}_2
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_1
c     b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨  b^{70, 11}_0
c  in DIMACS:
 18098  18099  18100  700  18101 0
 18098  18099  18100  700 -18102 0
 18098  18099  18100  700  18103 0

c  -1-1 --> -2
c    ( b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧  b^{70, 10}_0 ∧ -p_700) -> ( b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0)
c  in CNF:
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨  b^{70, 11}_2
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨  b^{70, 11}_1
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨  p_700 ∨ -b^{70, 11}_0
c  in DIMACS:
-18098  18099 -18100  700  18101 0
-18098  18099 -18100  700  18102 0
-18098  18099 -18100  700 -18103 0

c  -2-1 --> break 
c    ( b^{70, 10}_2 ∧  b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨  b^{70, 10}_0 ∨  p_700 ∨ break
c  in DIMACS:
-18098 -18099  18100  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 10}_2 ∧ -b^{70, 10}_1 ∧ -b^{70, 10}_0 ∧ true) 
c  in CNF:
c    -b^{70, 10}_2 ∨  b^{70, 10}_1 ∨  b^{70, 10}_0 ∨ false 
c  in DIMACS:
-18098  18099  18100  0

c  3 does not represent an automaton state.
c    -(-b^{70, 10}_2 ∧  b^{70, 10}_1 ∧  b^{70, 10}_0 ∧ true) 
c  in CNF:
c     b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ false 
c  in DIMACS:
 18098 -18099 -18100  0
c  -3 does not represent an automaton state.
c    -( b^{70, 10}_2 ∧  b^{70, 10}_1 ∧  b^{70, 10}_0 ∧ true) 
c  in CNF:
c    -b^{70, 10}_2 ∨ -b^{70, 10}_1 ∨ -b^{70, 10}_0 ∨ false 
c  in DIMACS:
-18098 -18099 -18100  0

c i = 11
c  -2+1 --> -1
c    ( b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧  p_770) -> ( b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0)
c  in CNF:
c    -b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨  b^{70, 12}_2
c    -b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_1
c    -b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨  b^{70, 12}_0
c  in DIMACS:
-18101 -18102  18103 -770  18104 0
-18101 -18102  18103 -770 -18105 0
-18101 -18102  18103 -770  18106 0

c  -1+1 --> 0
c    ( b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0 ∧  p_770) -> (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧ -b^{70, 12}_0)
c  in CNF:
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_2
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_1
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_0
c  in DIMACS:
-18101  18102 -18103 -770 -18104 0
-18101  18102 -18103 -770 -18105 0
-18101  18102 -18103 -770 -18106 0

c  0+1 --> 1
c    (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧  p_770) -> (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0)
c  in CNF:
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_2
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_1
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨  b^{70, 12}_0
c  in DIMACS:
 18101  18102  18103 -770 -18104 0
 18101  18102  18103 -770 -18105 0
 18101  18102  18103 -770  18106 0

c  1+1 --> 2
c    (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0 ∧  p_770) -> (-b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0)
c  in CNF:
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_2
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨  b^{70, 12}_1
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ -p_770 ∨ -b^{70, 12}_0
c  in DIMACS:
 18101  18102 -18103 -770 -18104 0
 18101  18102 -18103 -770  18105 0
 18101  18102 -18103 -770 -18106 0

c  2+1 --> break 
c    (-b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧  p_770) -> break
c  in CNF:
c     b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 18101 -18102  18103 -770 1162 0


c  2-1 --> 1
c    (-b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧ -p_770) -> (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0)
c  in CNF:
c     b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_2
c     b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_1
c     b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨  b^{70, 12}_0
c  in DIMACS:
 18101 -18102  18103  770 -18104 0
 18101 -18102  18103  770 -18105 0
 18101 -18102  18103  770  18106 0

c  1-1 --> 0
c    (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0 ∧ -p_770) -> (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧ -b^{70, 12}_0)
c  in CNF:
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_2
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_1
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_0
c  in DIMACS:
 18101  18102 -18103  770 -18104 0
 18101  18102 -18103  770 -18105 0
 18101  18102 -18103  770 -18106 0

c  0-1 --> -1
c    (-b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧ -p_770) -> ( b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0)
c  in CNF:
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨  b^{70, 12}_2
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_1
c     b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨  b^{70, 12}_0
c  in DIMACS:
 18101  18102  18103  770  18104 0
 18101  18102  18103  770 -18105 0
 18101  18102  18103  770  18106 0

c  -1-1 --> -2
c    ( b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧  b^{70, 11}_0 ∧ -p_770) -> ( b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0)
c  in CNF:
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨  b^{70, 12}_2
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨  b^{70, 12}_1
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨  p_770 ∨ -b^{70, 12}_0
c  in DIMACS:
-18101  18102 -18103  770  18104 0
-18101  18102 -18103  770  18105 0
-18101  18102 -18103  770 -18106 0

c  -2-1 --> break 
c    ( b^{70, 11}_2 ∧  b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨  b^{70, 11}_0 ∨  p_770 ∨ break
c  in DIMACS:
-18101 -18102  18103  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 11}_2 ∧ -b^{70, 11}_1 ∧ -b^{70, 11}_0 ∧ true) 
c  in CNF:
c    -b^{70, 11}_2 ∨  b^{70, 11}_1 ∨  b^{70, 11}_0 ∨ false 
c  in DIMACS:
-18101  18102  18103  0

c  3 does not represent an automaton state.
c    -(-b^{70, 11}_2 ∧  b^{70, 11}_1 ∧  b^{70, 11}_0 ∧ true) 
c  in CNF:
c     b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ false 
c  in DIMACS:
 18101 -18102 -18103  0
c  -3 does not represent an automaton state.
c    -( b^{70, 11}_2 ∧  b^{70, 11}_1 ∧  b^{70, 11}_0 ∧ true) 
c  in CNF:
c    -b^{70, 11}_2 ∨ -b^{70, 11}_1 ∨ -b^{70, 11}_0 ∨ false 
c  in DIMACS:
-18101 -18102 -18103  0

c i = 12
c  -2+1 --> -1
c    ( b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧  p_840) -> ( b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0)
c  in CNF:
c    -b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨  b^{70, 13}_2
c    -b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_1
c    -b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨  b^{70, 13}_0
c  in DIMACS:
-18104 -18105  18106 -840  18107 0
-18104 -18105  18106 -840 -18108 0
-18104 -18105  18106 -840  18109 0

c  -1+1 --> 0
c    ( b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0 ∧  p_840) -> (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧ -b^{70, 13}_0)
c  in CNF:
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_2
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_1
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_0
c  in DIMACS:
-18104  18105 -18106 -840 -18107 0
-18104  18105 -18106 -840 -18108 0
-18104  18105 -18106 -840 -18109 0

c  0+1 --> 1
c    (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧  p_840) -> (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0)
c  in CNF:
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_2
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_1
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨  b^{70, 13}_0
c  in DIMACS:
 18104  18105  18106 -840 -18107 0
 18104  18105  18106 -840 -18108 0
 18104  18105  18106 -840  18109 0

c  1+1 --> 2
c    (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0 ∧  p_840) -> (-b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0)
c  in CNF:
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_2
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨  b^{70, 13}_1
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ -p_840 ∨ -b^{70, 13}_0
c  in DIMACS:
 18104  18105 -18106 -840 -18107 0
 18104  18105 -18106 -840  18108 0
 18104  18105 -18106 -840 -18109 0

c  2+1 --> break 
c    (-b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧  p_840) -> break
c  in CNF:
c     b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 18104 -18105  18106 -840 1162 0


c  2-1 --> 1
c    (-b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧ -p_840) -> (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0)
c  in CNF:
c     b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_2
c     b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_1
c     b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨  b^{70, 13}_0
c  in DIMACS:
 18104 -18105  18106  840 -18107 0
 18104 -18105  18106  840 -18108 0
 18104 -18105  18106  840  18109 0

c  1-1 --> 0
c    (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0 ∧ -p_840) -> (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧ -b^{70, 13}_0)
c  in CNF:
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_2
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_1
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_0
c  in DIMACS:
 18104  18105 -18106  840 -18107 0
 18104  18105 -18106  840 -18108 0
 18104  18105 -18106  840 -18109 0

c  0-1 --> -1
c    (-b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧ -p_840) -> ( b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0)
c  in CNF:
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨  b^{70, 13}_2
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_1
c     b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨  b^{70, 13}_0
c  in DIMACS:
 18104  18105  18106  840  18107 0
 18104  18105  18106  840 -18108 0
 18104  18105  18106  840  18109 0

c  -1-1 --> -2
c    ( b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧  b^{70, 12}_0 ∧ -p_840) -> ( b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0)
c  in CNF:
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨  b^{70, 13}_2
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨  b^{70, 13}_1
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨  p_840 ∨ -b^{70, 13}_0
c  in DIMACS:
-18104  18105 -18106  840  18107 0
-18104  18105 -18106  840  18108 0
-18104  18105 -18106  840 -18109 0

c  -2-1 --> break 
c    ( b^{70, 12}_2 ∧  b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨  b^{70, 12}_0 ∨  p_840 ∨ break
c  in DIMACS:
-18104 -18105  18106  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 12}_2 ∧ -b^{70, 12}_1 ∧ -b^{70, 12}_0 ∧ true) 
c  in CNF:
c    -b^{70, 12}_2 ∨  b^{70, 12}_1 ∨  b^{70, 12}_0 ∨ false 
c  in DIMACS:
-18104  18105  18106  0

c  3 does not represent an automaton state.
c    -(-b^{70, 12}_2 ∧  b^{70, 12}_1 ∧  b^{70, 12}_0 ∧ true) 
c  in CNF:
c     b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ false 
c  in DIMACS:
 18104 -18105 -18106  0
c  -3 does not represent an automaton state.
c    -( b^{70, 12}_2 ∧  b^{70, 12}_1 ∧  b^{70, 12}_0 ∧ true) 
c  in CNF:
c    -b^{70, 12}_2 ∨ -b^{70, 12}_1 ∨ -b^{70, 12}_0 ∨ false 
c  in DIMACS:
-18104 -18105 -18106  0

c i = 13
c  -2+1 --> -1
c    ( b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧  p_910) -> ( b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0)
c  in CNF:
c    -b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨  b^{70, 14}_2
c    -b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_1
c    -b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨  b^{70, 14}_0
c  in DIMACS:
-18107 -18108  18109 -910  18110 0
-18107 -18108  18109 -910 -18111 0
-18107 -18108  18109 -910  18112 0

c  -1+1 --> 0
c    ( b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0 ∧  p_910) -> (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧ -b^{70, 14}_0)
c  in CNF:
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_2
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_1
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_0
c  in DIMACS:
-18107  18108 -18109 -910 -18110 0
-18107  18108 -18109 -910 -18111 0
-18107  18108 -18109 -910 -18112 0

c  0+1 --> 1
c    (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧  p_910) -> (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0)
c  in CNF:
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_2
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_1
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨  b^{70, 14}_0
c  in DIMACS:
 18107  18108  18109 -910 -18110 0
 18107  18108  18109 -910 -18111 0
 18107  18108  18109 -910  18112 0

c  1+1 --> 2
c    (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0 ∧  p_910) -> (-b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0)
c  in CNF:
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_2
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨  b^{70, 14}_1
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ -p_910 ∨ -b^{70, 14}_0
c  in DIMACS:
 18107  18108 -18109 -910 -18110 0
 18107  18108 -18109 -910  18111 0
 18107  18108 -18109 -910 -18112 0

c  2+1 --> break 
c    (-b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧  p_910) -> break
c  in CNF:
c     b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 18107 -18108  18109 -910 1162 0


c  2-1 --> 1
c    (-b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧ -p_910) -> (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0)
c  in CNF:
c     b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_2
c     b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_1
c     b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨  b^{70, 14}_0
c  in DIMACS:
 18107 -18108  18109  910 -18110 0
 18107 -18108  18109  910 -18111 0
 18107 -18108  18109  910  18112 0

c  1-1 --> 0
c    (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0 ∧ -p_910) -> (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧ -b^{70, 14}_0)
c  in CNF:
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_2
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_1
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_0
c  in DIMACS:
 18107  18108 -18109  910 -18110 0
 18107  18108 -18109  910 -18111 0
 18107  18108 -18109  910 -18112 0

c  0-1 --> -1
c    (-b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧ -p_910) -> ( b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0)
c  in CNF:
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨  b^{70, 14}_2
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_1
c     b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨  b^{70, 14}_0
c  in DIMACS:
 18107  18108  18109  910  18110 0
 18107  18108  18109  910 -18111 0
 18107  18108  18109  910  18112 0

c  -1-1 --> -2
c    ( b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧  b^{70, 13}_0 ∧ -p_910) -> ( b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0)
c  in CNF:
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨  b^{70, 14}_2
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨  b^{70, 14}_1
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨  p_910 ∨ -b^{70, 14}_0
c  in DIMACS:
-18107  18108 -18109  910  18110 0
-18107  18108 -18109  910  18111 0
-18107  18108 -18109  910 -18112 0

c  -2-1 --> break 
c    ( b^{70, 13}_2 ∧  b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨  b^{70, 13}_0 ∨  p_910 ∨ break
c  in DIMACS:
-18107 -18108  18109  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 13}_2 ∧ -b^{70, 13}_1 ∧ -b^{70, 13}_0 ∧ true) 
c  in CNF:
c    -b^{70, 13}_2 ∨  b^{70, 13}_1 ∨  b^{70, 13}_0 ∨ false 
c  in DIMACS:
-18107  18108  18109  0

c  3 does not represent an automaton state.
c    -(-b^{70, 13}_2 ∧  b^{70, 13}_1 ∧  b^{70, 13}_0 ∧ true) 
c  in CNF:
c     b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ false 
c  in DIMACS:
 18107 -18108 -18109  0
c  -3 does not represent an automaton state.
c    -( b^{70, 13}_2 ∧  b^{70, 13}_1 ∧  b^{70, 13}_0 ∧ true) 
c  in CNF:
c    -b^{70, 13}_2 ∨ -b^{70, 13}_1 ∨ -b^{70, 13}_0 ∨ false 
c  in DIMACS:
-18107 -18108 -18109  0

c i = 14
c  -2+1 --> -1
c    ( b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧  p_980) -> ( b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0)
c  in CNF:
c    -b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨  b^{70, 15}_2
c    -b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_1
c    -b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨  b^{70, 15}_0
c  in DIMACS:
-18110 -18111  18112 -980  18113 0
-18110 -18111  18112 -980 -18114 0
-18110 -18111  18112 -980  18115 0

c  -1+1 --> 0
c    ( b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0 ∧  p_980) -> (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧ -b^{70, 15}_0)
c  in CNF:
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_2
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_1
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_0
c  in DIMACS:
-18110  18111 -18112 -980 -18113 0
-18110  18111 -18112 -980 -18114 0
-18110  18111 -18112 -980 -18115 0

c  0+1 --> 1
c    (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧  p_980) -> (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0)
c  in CNF:
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_2
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_1
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨  b^{70, 15}_0
c  in DIMACS:
 18110  18111  18112 -980 -18113 0
 18110  18111  18112 -980 -18114 0
 18110  18111  18112 -980  18115 0

c  1+1 --> 2
c    (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0 ∧  p_980) -> (-b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0)
c  in CNF:
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_2
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨  b^{70, 15}_1
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ -p_980 ∨ -b^{70, 15}_0
c  in DIMACS:
 18110  18111 -18112 -980 -18113 0
 18110  18111 -18112 -980  18114 0
 18110  18111 -18112 -980 -18115 0

c  2+1 --> break 
c    (-b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧  p_980) -> break
c  in CNF:
c     b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 18110 -18111  18112 -980 1162 0


c  2-1 --> 1
c    (-b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧ -p_980) -> (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0)
c  in CNF:
c     b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_2
c     b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_1
c     b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨  b^{70, 15}_0
c  in DIMACS:
 18110 -18111  18112  980 -18113 0
 18110 -18111  18112  980 -18114 0
 18110 -18111  18112  980  18115 0

c  1-1 --> 0
c    (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0 ∧ -p_980) -> (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧ -b^{70, 15}_0)
c  in CNF:
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_2
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_1
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_0
c  in DIMACS:
 18110  18111 -18112  980 -18113 0
 18110  18111 -18112  980 -18114 0
 18110  18111 -18112  980 -18115 0

c  0-1 --> -1
c    (-b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧ -p_980) -> ( b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0)
c  in CNF:
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨  b^{70, 15}_2
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_1
c     b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨  b^{70, 15}_0
c  in DIMACS:
 18110  18111  18112  980  18113 0
 18110  18111  18112  980 -18114 0
 18110  18111  18112  980  18115 0

c  -1-1 --> -2
c    ( b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧  b^{70, 14}_0 ∧ -p_980) -> ( b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0)
c  in CNF:
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨  b^{70, 15}_2
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨  b^{70, 15}_1
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨  p_980 ∨ -b^{70, 15}_0
c  in DIMACS:
-18110  18111 -18112  980  18113 0
-18110  18111 -18112  980  18114 0
-18110  18111 -18112  980 -18115 0

c  -2-1 --> break 
c    ( b^{70, 14}_2 ∧  b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨  b^{70, 14}_0 ∨  p_980 ∨ break
c  in DIMACS:
-18110 -18111  18112  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 14}_2 ∧ -b^{70, 14}_1 ∧ -b^{70, 14}_0 ∧ true) 
c  in CNF:
c    -b^{70, 14}_2 ∨  b^{70, 14}_1 ∨  b^{70, 14}_0 ∨ false 
c  in DIMACS:
-18110  18111  18112  0

c  3 does not represent an automaton state.
c    -(-b^{70, 14}_2 ∧  b^{70, 14}_1 ∧  b^{70, 14}_0 ∧ true) 
c  in CNF:
c     b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ false 
c  in DIMACS:
 18110 -18111 -18112  0
c  -3 does not represent an automaton state.
c    -( b^{70, 14}_2 ∧  b^{70, 14}_1 ∧  b^{70, 14}_0 ∧ true) 
c  in CNF:
c    -b^{70, 14}_2 ∨ -b^{70, 14}_1 ∨ -b^{70, 14}_0 ∨ false 
c  in DIMACS:
-18110 -18111 -18112  0

c i = 15
c  -2+1 --> -1
c    ( b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧  p_1050) -> ( b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0)
c  in CNF:
c    -b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨  b^{70, 16}_2
c    -b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_1
c    -b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨  b^{70, 16}_0
c  in DIMACS:
-18113 -18114  18115 -1050  18116 0
-18113 -18114  18115 -1050 -18117 0
-18113 -18114  18115 -1050  18118 0

c  -1+1 --> 0
c    ( b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0 ∧  p_1050) -> (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧ -b^{70, 16}_0)
c  in CNF:
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_2
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_1
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_0
c  in DIMACS:
-18113  18114 -18115 -1050 -18116 0
-18113  18114 -18115 -1050 -18117 0
-18113  18114 -18115 -1050 -18118 0

c  0+1 --> 1
c    (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧  p_1050) -> (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0)
c  in CNF:
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_2
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_1
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨  b^{70, 16}_0
c  in DIMACS:
 18113  18114  18115 -1050 -18116 0
 18113  18114  18115 -1050 -18117 0
 18113  18114  18115 -1050  18118 0

c  1+1 --> 2
c    (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0 ∧  p_1050) -> (-b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0)
c  in CNF:
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_2
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨  b^{70, 16}_1
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ -p_1050 ∨ -b^{70, 16}_0
c  in DIMACS:
 18113  18114 -18115 -1050 -18116 0
 18113  18114 -18115 -1050  18117 0
 18113  18114 -18115 -1050 -18118 0

c  2+1 --> break 
c    (-b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 18113 -18114  18115 -1050 1162 0


c  2-1 --> 1
c    (-b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧ -p_1050) -> (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0)
c  in CNF:
c     b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_2
c     b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_1
c     b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨  b^{70, 16}_0
c  in DIMACS:
 18113 -18114  18115  1050 -18116 0
 18113 -18114  18115  1050 -18117 0
 18113 -18114  18115  1050  18118 0

c  1-1 --> 0
c    (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0 ∧ -p_1050) -> (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧ -b^{70, 16}_0)
c  in CNF:
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_2
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_1
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_0
c  in DIMACS:
 18113  18114 -18115  1050 -18116 0
 18113  18114 -18115  1050 -18117 0
 18113  18114 -18115  1050 -18118 0

c  0-1 --> -1
c    (-b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧ -p_1050) -> ( b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0)
c  in CNF:
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨  b^{70, 16}_2
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_1
c     b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨  b^{70, 16}_0
c  in DIMACS:
 18113  18114  18115  1050  18116 0
 18113  18114  18115  1050 -18117 0
 18113  18114  18115  1050  18118 0

c  -1-1 --> -2
c    ( b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧  b^{70, 15}_0 ∧ -p_1050) -> ( b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0)
c  in CNF:
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨  b^{70, 16}_2
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨  b^{70, 16}_1
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨  p_1050 ∨ -b^{70, 16}_0
c  in DIMACS:
-18113  18114 -18115  1050  18116 0
-18113  18114 -18115  1050  18117 0
-18113  18114 -18115  1050 -18118 0

c  -2-1 --> break 
c    ( b^{70, 15}_2 ∧  b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨  b^{70, 15}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-18113 -18114  18115  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 15}_2 ∧ -b^{70, 15}_1 ∧ -b^{70, 15}_0 ∧ true) 
c  in CNF:
c    -b^{70, 15}_2 ∨  b^{70, 15}_1 ∨  b^{70, 15}_0 ∨ false 
c  in DIMACS:
-18113  18114  18115  0

c  3 does not represent an automaton state.
c    -(-b^{70, 15}_2 ∧  b^{70, 15}_1 ∧  b^{70, 15}_0 ∧ true) 
c  in CNF:
c     b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ false 
c  in DIMACS:
 18113 -18114 -18115  0
c  -3 does not represent an automaton state.
c    -( b^{70, 15}_2 ∧  b^{70, 15}_1 ∧  b^{70, 15}_0 ∧ true) 
c  in CNF:
c    -b^{70, 15}_2 ∨ -b^{70, 15}_1 ∨ -b^{70, 15}_0 ∨ false 
c  in DIMACS:
-18113 -18114 -18115  0

c i = 16
c  -2+1 --> -1
c    ( b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧  p_1120) -> ( b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧  b^{70, 17}_0)
c  in CNF:
c    -b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨  b^{70, 17}_2
c    -b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_1
c    -b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨  b^{70, 17}_0
c  in DIMACS:
-18116 -18117  18118 -1120  18119 0
-18116 -18117  18118 -1120 -18120 0
-18116 -18117  18118 -1120  18121 0

c  -1+1 --> 0
c    ( b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0 ∧  p_1120) -> (-b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧ -b^{70, 17}_0)
c  in CNF:
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_2
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_1
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_0
c  in DIMACS:
-18116  18117 -18118 -1120 -18119 0
-18116  18117 -18118 -1120 -18120 0
-18116  18117 -18118 -1120 -18121 0

c  0+1 --> 1
c    (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧  p_1120) -> (-b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧  b^{70, 17}_0)
c  in CNF:
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_2
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_1
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨  b^{70, 17}_0
c  in DIMACS:
 18116  18117  18118 -1120 -18119 0
 18116  18117  18118 -1120 -18120 0
 18116  18117  18118 -1120  18121 0

c  1+1 --> 2
c    (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0 ∧  p_1120) -> (-b^{70, 17}_2 ∧  b^{70, 17}_1 ∧ -b^{70, 17}_0)
c  in CNF:
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_2
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨  b^{70, 17}_1
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ -p_1120 ∨ -b^{70, 17}_0
c  in DIMACS:
 18116  18117 -18118 -1120 -18119 0
 18116  18117 -18118 -1120  18120 0
 18116  18117 -18118 -1120 -18121 0

c  2+1 --> break 
c    (-b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 18116 -18117  18118 -1120 1162 0


c  2-1 --> 1
c    (-b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧ -p_1120) -> (-b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧  b^{70, 17}_0)
c  in CNF:
c     b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_2
c     b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_1
c     b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨  b^{70, 17}_0
c  in DIMACS:
 18116 -18117  18118  1120 -18119 0
 18116 -18117  18118  1120 -18120 0
 18116 -18117  18118  1120  18121 0

c  1-1 --> 0
c    (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0 ∧ -p_1120) -> (-b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧ -b^{70, 17}_0)
c  in CNF:
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_2
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_1
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_0
c  in DIMACS:
 18116  18117 -18118  1120 -18119 0
 18116  18117 -18118  1120 -18120 0
 18116  18117 -18118  1120 -18121 0

c  0-1 --> -1
c    (-b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧ -p_1120) -> ( b^{70, 17}_2 ∧ -b^{70, 17}_1 ∧  b^{70, 17}_0)
c  in CNF:
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨  b^{70, 17}_2
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_1
c     b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨  b^{70, 17}_0
c  in DIMACS:
 18116  18117  18118  1120  18119 0
 18116  18117  18118  1120 -18120 0
 18116  18117  18118  1120  18121 0

c  -1-1 --> -2
c    ( b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧  b^{70, 16}_0 ∧ -p_1120) -> ( b^{70, 17}_2 ∧  b^{70, 17}_1 ∧ -b^{70, 17}_0)
c  in CNF:
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨  b^{70, 17}_2
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨  b^{70, 17}_1
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨  p_1120 ∨ -b^{70, 17}_0
c  in DIMACS:
-18116  18117 -18118  1120  18119 0
-18116  18117 -18118  1120  18120 0
-18116  18117 -18118  1120 -18121 0

c  -2-1 --> break 
c    ( b^{70, 16}_2 ∧  b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨  b^{70, 16}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-18116 -18117  18118  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{70, 16}_2 ∧ -b^{70, 16}_1 ∧ -b^{70, 16}_0 ∧ true) 
c  in CNF:
c    -b^{70, 16}_2 ∨  b^{70, 16}_1 ∨  b^{70, 16}_0 ∨ false 
c  in DIMACS:
-18116  18117  18118  0

c  3 does not represent an automaton state.
c    -(-b^{70, 16}_2 ∧  b^{70, 16}_1 ∧  b^{70, 16}_0 ∧ true) 
c  in CNF:
c     b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ false 
c  in DIMACS:
 18116 -18117 -18118  0
c  -3 does not represent an automaton state.
c    -( b^{70, 16}_2 ∧  b^{70, 16}_1 ∧  b^{70, 16}_0 ∧ true) 
c  in CNF:
c    -b^{70, 16}_2 ∨ -b^{70, 16}_1 ∨ -b^{70, 16}_0 ∨ false 
c  in DIMACS:
-18116 -18117 -18118  0

c INIT for k = 71
c    -b^{71, 1}_2
c    -b^{71, 1}_1
c    -b^{71, 1}_0
c  in DIMACS:
-18122 0
-18123 0
-18124 0

c Transitions for k = 71
c i = 1
c  -2+1 --> -1
c    ( b^{71, 1}_2 ∧  b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧  p_71) -> ( b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0)
c  in CNF:
c    -b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨  b^{71, 2}_2
c    -b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_1
c    -b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨  b^{71, 2}_0
c  in DIMACS:
-18122 -18123  18124 -71  18125 0
-18122 -18123  18124 -71 -18126 0
-18122 -18123  18124 -71  18127 0

c  -1+1 --> 0
c    ( b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧  b^{71, 1}_0 ∧  p_71) -> (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧ -b^{71, 2}_0)
c  in CNF:
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_2
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_1
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_0
c  in DIMACS:
-18122  18123 -18124 -71 -18125 0
-18122  18123 -18124 -71 -18126 0
-18122  18123 -18124 -71 -18127 0

c  0+1 --> 1
c    (-b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧  p_71) -> (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0)
c  in CNF:
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_2
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_1
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨  b^{71, 2}_0
c  in DIMACS:
 18122  18123  18124 -71 -18125 0
 18122  18123  18124 -71 -18126 0
 18122  18123  18124 -71  18127 0

c  1+1 --> 2
c    (-b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧  b^{71, 1}_0 ∧  p_71) -> (-b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0)
c  in CNF:
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_2
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨  b^{71, 2}_1
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ -p_71 ∨ -b^{71, 2}_0
c  in DIMACS:
 18122  18123 -18124 -71 -18125 0
 18122  18123 -18124 -71  18126 0
 18122  18123 -18124 -71 -18127 0

c  2+1 --> break 
c    (-b^{71, 1}_2 ∧  b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧  p_71) -> break
c  in CNF:
c     b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ -p_71 ∨ break
c  in DIMACS:
 18122 -18123  18124 -71 1162 0


c  2-1 --> 1
c    (-b^{71, 1}_2 ∧  b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧ -p_71) -> (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0)
c  in CNF:
c     b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_2
c     b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_1
c     b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨  b^{71, 2}_0
c  in DIMACS:
 18122 -18123  18124  71 -18125 0
 18122 -18123  18124  71 -18126 0
 18122 -18123  18124  71  18127 0

c  1-1 --> 0
c    (-b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧  b^{71, 1}_0 ∧ -p_71) -> (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧ -b^{71, 2}_0)
c  in CNF:
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_2
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_1
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_0
c  in DIMACS:
 18122  18123 -18124  71 -18125 0
 18122  18123 -18124  71 -18126 0
 18122  18123 -18124  71 -18127 0

c  0-1 --> -1
c    (-b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧ -p_71) -> ( b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0)
c  in CNF:
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨  b^{71, 2}_2
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_1
c     b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨  b^{71, 2}_0
c  in DIMACS:
 18122  18123  18124  71  18125 0
 18122  18123  18124  71 -18126 0
 18122  18123  18124  71  18127 0

c  -1-1 --> -2
c    ( b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧  b^{71, 1}_0 ∧ -p_71) -> ( b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0)
c  in CNF:
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨  b^{71, 2}_2
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨  b^{71, 2}_1
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨  p_71 ∨ -b^{71, 2}_0
c  in DIMACS:
-18122  18123 -18124  71  18125 0
-18122  18123 -18124  71  18126 0
-18122  18123 -18124  71 -18127 0

c  -2-1 --> break 
c    ( b^{71, 1}_2 ∧  b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧ -p_71) -> break
c  in CNF:
c    -b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨  b^{71, 1}_0 ∨  p_71 ∨ break
c  in DIMACS:
-18122 -18123  18124  71 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 1}_2 ∧ -b^{71, 1}_1 ∧ -b^{71, 1}_0 ∧ true) 
c  in CNF:
c    -b^{71, 1}_2 ∨  b^{71, 1}_1 ∨  b^{71, 1}_0 ∨ false 
c  in DIMACS:
-18122  18123  18124  0

c  3 does not represent an automaton state.
c    -(-b^{71, 1}_2 ∧  b^{71, 1}_1 ∧  b^{71, 1}_0 ∧ true) 
c  in CNF:
c     b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ false 
c  in DIMACS:
 18122 -18123 -18124  0
c  -3 does not represent an automaton state.
c    -( b^{71, 1}_2 ∧  b^{71, 1}_1 ∧  b^{71, 1}_0 ∧ true) 
c  in CNF:
c    -b^{71, 1}_2 ∨ -b^{71, 1}_1 ∨ -b^{71, 1}_0 ∨ false 
c  in DIMACS:
-18122 -18123 -18124  0

c i = 2
c  -2+1 --> -1
c    ( b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧  p_142) -> ( b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0)
c  in CNF:
c    -b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨  b^{71, 3}_2
c    -b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_1
c    -b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨  b^{71, 3}_0
c  in DIMACS:
-18125 -18126  18127 -142  18128 0
-18125 -18126  18127 -142 -18129 0
-18125 -18126  18127 -142  18130 0

c  -1+1 --> 0
c    ( b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0 ∧  p_142) -> (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧ -b^{71, 3}_0)
c  in CNF:
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_2
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_1
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_0
c  in DIMACS:
-18125  18126 -18127 -142 -18128 0
-18125  18126 -18127 -142 -18129 0
-18125  18126 -18127 -142 -18130 0

c  0+1 --> 1
c    (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧  p_142) -> (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0)
c  in CNF:
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_2
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_1
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨  b^{71, 3}_0
c  in DIMACS:
 18125  18126  18127 -142 -18128 0
 18125  18126  18127 -142 -18129 0
 18125  18126  18127 -142  18130 0

c  1+1 --> 2
c    (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0 ∧  p_142) -> (-b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0)
c  in CNF:
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_2
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨  b^{71, 3}_1
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ -p_142 ∨ -b^{71, 3}_0
c  in DIMACS:
 18125  18126 -18127 -142 -18128 0
 18125  18126 -18127 -142  18129 0
 18125  18126 -18127 -142 -18130 0

c  2+1 --> break 
c    (-b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧  p_142) -> break
c  in CNF:
c     b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ -p_142 ∨ break
c  in DIMACS:
 18125 -18126  18127 -142 1162 0


c  2-1 --> 1
c    (-b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧ -p_142) -> (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0)
c  in CNF:
c     b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_2
c     b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_1
c     b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨  b^{71, 3}_0
c  in DIMACS:
 18125 -18126  18127  142 -18128 0
 18125 -18126  18127  142 -18129 0
 18125 -18126  18127  142  18130 0

c  1-1 --> 0
c    (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0 ∧ -p_142) -> (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧ -b^{71, 3}_0)
c  in CNF:
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_2
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_1
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_0
c  in DIMACS:
 18125  18126 -18127  142 -18128 0
 18125  18126 -18127  142 -18129 0
 18125  18126 -18127  142 -18130 0

c  0-1 --> -1
c    (-b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧ -p_142) -> ( b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0)
c  in CNF:
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨  b^{71, 3}_2
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_1
c     b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨  b^{71, 3}_0
c  in DIMACS:
 18125  18126  18127  142  18128 0
 18125  18126  18127  142 -18129 0
 18125  18126  18127  142  18130 0

c  -1-1 --> -2
c    ( b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧  b^{71, 2}_0 ∧ -p_142) -> ( b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0)
c  in CNF:
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨  b^{71, 3}_2
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨  b^{71, 3}_1
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨  p_142 ∨ -b^{71, 3}_0
c  in DIMACS:
-18125  18126 -18127  142  18128 0
-18125  18126 -18127  142  18129 0
-18125  18126 -18127  142 -18130 0

c  -2-1 --> break 
c    ( b^{71, 2}_2 ∧  b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧ -p_142) -> break
c  in CNF:
c    -b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨  b^{71, 2}_0 ∨  p_142 ∨ break
c  in DIMACS:
-18125 -18126  18127  142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 2}_2 ∧ -b^{71, 2}_1 ∧ -b^{71, 2}_0 ∧ true) 
c  in CNF:
c    -b^{71, 2}_2 ∨  b^{71, 2}_1 ∨  b^{71, 2}_0 ∨ false 
c  in DIMACS:
-18125  18126  18127  0

c  3 does not represent an automaton state.
c    -(-b^{71, 2}_2 ∧  b^{71, 2}_1 ∧  b^{71, 2}_0 ∧ true) 
c  in CNF:
c     b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ false 
c  in DIMACS:
 18125 -18126 -18127  0
c  -3 does not represent an automaton state.
c    -( b^{71, 2}_2 ∧  b^{71, 2}_1 ∧  b^{71, 2}_0 ∧ true) 
c  in CNF:
c    -b^{71, 2}_2 ∨ -b^{71, 2}_1 ∨ -b^{71, 2}_0 ∨ false 
c  in DIMACS:
-18125 -18126 -18127  0

c i = 3
c  -2+1 --> -1
c    ( b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧  p_213) -> ( b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0)
c  in CNF:
c    -b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨  b^{71, 4}_2
c    -b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_1
c    -b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨  b^{71, 4}_0
c  in DIMACS:
-18128 -18129  18130 -213  18131 0
-18128 -18129  18130 -213 -18132 0
-18128 -18129  18130 -213  18133 0

c  -1+1 --> 0
c    ( b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0 ∧  p_213) -> (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧ -b^{71, 4}_0)
c  in CNF:
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_2
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_1
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_0
c  in DIMACS:
-18128  18129 -18130 -213 -18131 0
-18128  18129 -18130 -213 -18132 0
-18128  18129 -18130 -213 -18133 0

c  0+1 --> 1
c    (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧  p_213) -> (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0)
c  in CNF:
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_2
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_1
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨  b^{71, 4}_0
c  in DIMACS:
 18128  18129  18130 -213 -18131 0
 18128  18129  18130 -213 -18132 0
 18128  18129  18130 -213  18133 0

c  1+1 --> 2
c    (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0 ∧  p_213) -> (-b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0)
c  in CNF:
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_2
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨  b^{71, 4}_1
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ -p_213 ∨ -b^{71, 4}_0
c  in DIMACS:
 18128  18129 -18130 -213 -18131 0
 18128  18129 -18130 -213  18132 0
 18128  18129 -18130 -213 -18133 0

c  2+1 --> break 
c    (-b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧  p_213) -> break
c  in CNF:
c     b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ -p_213 ∨ break
c  in DIMACS:
 18128 -18129  18130 -213 1162 0


c  2-1 --> 1
c    (-b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧ -p_213) -> (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0)
c  in CNF:
c     b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_2
c     b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_1
c     b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨  b^{71, 4}_0
c  in DIMACS:
 18128 -18129  18130  213 -18131 0
 18128 -18129  18130  213 -18132 0
 18128 -18129  18130  213  18133 0

c  1-1 --> 0
c    (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0 ∧ -p_213) -> (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧ -b^{71, 4}_0)
c  in CNF:
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_2
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_1
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_0
c  in DIMACS:
 18128  18129 -18130  213 -18131 0
 18128  18129 -18130  213 -18132 0
 18128  18129 -18130  213 -18133 0

c  0-1 --> -1
c    (-b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧ -p_213) -> ( b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0)
c  in CNF:
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨  b^{71, 4}_2
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_1
c     b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨  b^{71, 4}_0
c  in DIMACS:
 18128  18129  18130  213  18131 0
 18128  18129  18130  213 -18132 0
 18128  18129  18130  213  18133 0

c  -1-1 --> -2
c    ( b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧  b^{71, 3}_0 ∧ -p_213) -> ( b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0)
c  in CNF:
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨  b^{71, 4}_2
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨  b^{71, 4}_1
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨  p_213 ∨ -b^{71, 4}_0
c  in DIMACS:
-18128  18129 -18130  213  18131 0
-18128  18129 -18130  213  18132 0
-18128  18129 -18130  213 -18133 0

c  -2-1 --> break 
c    ( b^{71, 3}_2 ∧  b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧ -p_213) -> break
c  in CNF:
c    -b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨  b^{71, 3}_0 ∨  p_213 ∨ break
c  in DIMACS:
-18128 -18129  18130  213 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 3}_2 ∧ -b^{71, 3}_1 ∧ -b^{71, 3}_0 ∧ true) 
c  in CNF:
c    -b^{71, 3}_2 ∨  b^{71, 3}_1 ∨  b^{71, 3}_0 ∨ false 
c  in DIMACS:
-18128  18129  18130  0

c  3 does not represent an automaton state.
c    -(-b^{71, 3}_2 ∧  b^{71, 3}_1 ∧  b^{71, 3}_0 ∧ true) 
c  in CNF:
c     b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ false 
c  in DIMACS:
 18128 -18129 -18130  0
c  -3 does not represent an automaton state.
c    -( b^{71, 3}_2 ∧  b^{71, 3}_1 ∧  b^{71, 3}_0 ∧ true) 
c  in CNF:
c    -b^{71, 3}_2 ∨ -b^{71, 3}_1 ∨ -b^{71, 3}_0 ∨ false 
c  in DIMACS:
-18128 -18129 -18130  0

c i = 4
c  -2+1 --> -1
c    ( b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧  p_284) -> ( b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0)
c  in CNF:
c    -b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨  b^{71, 5}_2
c    -b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_1
c    -b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨  b^{71, 5}_0
c  in DIMACS:
-18131 -18132  18133 -284  18134 0
-18131 -18132  18133 -284 -18135 0
-18131 -18132  18133 -284  18136 0

c  -1+1 --> 0
c    ( b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0 ∧  p_284) -> (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧ -b^{71, 5}_0)
c  in CNF:
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_2
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_1
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_0
c  in DIMACS:
-18131  18132 -18133 -284 -18134 0
-18131  18132 -18133 -284 -18135 0
-18131  18132 -18133 -284 -18136 0

c  0+1 --> 1
c    (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧  p_284) -> (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0)
c  in CNF:
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_2
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_1
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨  b^{71, 5}_0
c  in DIMACS:
 18131  18132  18133 -284 -18134 0
 18131  18132  18133 -284 -18135 0
 18131  18132  18133 -284  18136 0

c  1+1 --> 2
c    (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0 ∧  p_284) -> (-b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0)
c  in CNF:
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_2
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨  b^{71, 5}_1
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ -p_284 ∨ -b^{71, 5}_0
c  in DIMACS:
 18131  18132 -18133 -284 -18134 0
 18131  18132 -18133 -284  18135 0
 18131  18132 -18133 -284 -18136 0

c  2+1 --> break 
c    (-b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧  p_284) -> break
c  in CNF:
c     b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 18131 -18132  18133 -284 1162 0


c  2-1 --> 1
c    (-b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧ -p_284) -> (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0)
c  in CNF:
c     b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_2
c     b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_1
c     b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨  b^{71, 5}_0
c  in DIMACS:
 18131 -18132  18133  284 -18134 0
 18131 -18132  18133  284 -18135 0
 18131 -18132  18133  284  18136 0

c  1-1 --> 0
c    (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0 ∧ -p_284) -> (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧ -b^{71, 5}_0)
c  in CNF:
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_2
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_1
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_0
c  in DIMACS:
 18131  18132 -18133  284 -18134 0
 18131  18132 -18133  284 -18135 0
 18131  18132 -18133  284 -18136 0

c  0-1 --> -1
c    (-b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧ -p_284) -> ( b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0)
c  in CNF:
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨  b^{71, 5}_2
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_1
c     b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨  b^{71, 5}_0
c  in DIMACS:
 18131  18132  18133  284  18134 0
 18131  18132  18133  284 -18135 0
 18131  18132  18133  284  18136 0

c  -1-1 --> -2
c    ( b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧  b^{71, 4}_0 ∧ -p_284) -> ( b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0)
c  in CNF:
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨  b^{71, 5}_2
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨  b^{71, 5}_1
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨  p_284 ∨ -b^{71, 5}_0
c  in DIMACS:
-18131  18132 -18133  284  18134 0
-18131  18132 -18133  284  18135 0
-18131  18132 -18133  284 -18136 0

c  -2-1 --> break 
c    ( b^{71, 4}_2 ∧  b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨  b^{71, 4}_0 ∨  p_284 ∨ break
c  in DIMACS:
-18131 -18132  18133  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 4}_2 ∧ -b^{71, 4}_1 ∧ -b^{71, 4}_0 ∧ true) 
c  in CNF:
c    -b^{71, 4}_2 ∨  b^{71, 4}_1 ∨  b^{71, 4}_0 ∨ false 
c  in DIMACS:
-18131  18132  18133  0

c  3 does not represent an automaton state.
c    -(-b^{71, 4}_2 ∧  b^{71, 4}_1 ∧  b^{71, 4}_0 ∧ true) 
c  in CNF:
c     b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ false 
c  in DIMACS:
 18131 -18132 -18133  0
c  -3 does not represent an automaton state.
c    -( b^{71, 4}_2 ∧  b^{71, 4}_1 ∧  b^{71, 4}_0 ∧ true) 
c  in CNF:
c    -b^{71, 4}_2 ∨ -b^{71, 4}_1 ∨ -b^{71, 4}_0 ∨ false 
c  in DIMACS:
-18131 -18132 -18133  0

c i = 5
c  -2+1 --> -1
c    ( b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧  p_355) -> ( b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0)
c  in CNF:
c    -b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨  b^{71, 6}_2
c    -b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_1
c    -b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨  b^{71, 6}_0
c  in DIMACS:
-18134 -18135  18136 -355  18137 0
-18134 -18135  18136 -355 -18138 0
-18134 -18135  18136 -355  18139 0

c  -1+1 --> 0
c    ( b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0 ∧  p_355) -> (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧ -b^{71, 6}_0)
c  in CNF:
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_2
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_1
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_0
c  in DIMACS:
-18134  18135 -18136 -355 -18137 0
-18134  18135 -18136 -355 -18138 0
-18134  18135 -18136 -355 -18139 0

c  0+1 --> 1
c    (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧  p_355) -> (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0)
c  in CNF:
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_2
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_1
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨  b^{71, 6}_0
c  in DIMACS:
 18134  18135  18136 -355 -18137 0
 18134  18135  18136 -355 -18138 0
 18134  18135  18136 -355  18139 0

c  1+1 --> 2
c    (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0 ∧  p_355) -> (-b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0)
c  in CNF:
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_2
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨  b^{71, 6}_1
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ -p_355 ∨ -b^{71, 6}_0
c  in DIMACS:
 18134  18135 -18136 -355 -18137 0
 18134  18135 -18136 -355  18138 0
 18134  18135 -18136 -355 -18139 0

c  2+1 --> break 
c    (-b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧  p_355) -> break
c  in CNF:
c     b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ -p_355 ∨ break
c  in DIMACS:
 18134 -18135  18136 -355 1162 0


c  2-1 --> 1
c    (-b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧ -p_355) -> (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0)
c  in CNF:
c     b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_2
c     b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_1
c     b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨  b^{71, 6}_0
c  in DIMACS:
 18134 -18135  18136  355 -18137 0
 18134 -18135  18136  355 -18138 0
 18134 -18135  18136  355  18139 0

c  1-1 --> 0
c    (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0 ∧ -p_355) -> (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧ -b^{71, 6}_0)
c  in CNF:
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_2
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_1
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_0
c  in DIMACS:
 18134  18135 -18136  355 -18137 0
 18134  18135 -18136  355 -18138 0
 18134  18135 -18136  355 -18139 0

c  0-1 --> -1
c    (-b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧ -p_355) -> ( b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0)
c  in CNF:
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨  b^{71, 6}_2
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_1
c     b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨  b^{71, 6}_0
c  in DIMACS:
 18134  18135  18136  355  18137 0
 18134  18135  18136  355 -18138 0
 18134  18135  18136  355  18139 0

c  -1-1 --> -2
c    ( b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧  b^{71, 5}_0 ∧ -p_355) -> ( b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0)
c  in CNF:
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨  b^{71, 6}_2
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨  b^{71, 6}_1
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨  p_355 ∨ -b^{71, 6}_0
c  in DIMACS:
-18134  18135 -18136  355  18137 0
-18134  18135 -18136  355  18138 0
-18134  18135 -18136  355 -18139 0

c  -2-1 --> break 
c    ( b^{71, 5}_2 ∧  b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧ -p_355) -> break
c  in CNF:
c    -b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨  b^{71, 5}_0 ∨  p_355 ∨ break
c  in DIMACS:
-18134 -18135  18136  355 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 5}_2 ∧ -b^{71, 5}_1 ∧ -b^{71, 5}_0 ∧ true) 
c  in CNF:
c    -b^{71, 5}_2 ∨  b^{71, 5}_1 ∨  b^{71, 5}_0 ∨ false 
c  in DIMACS:
-18134  18135  18136  0

c  3 does not represent an automaton state.
c    -(-b^{71, 5}_2 ∧  b^{71, 5}_1 ∧  b^{71, 5}_0 ∧ true) 
c  in CNF:
c     b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ false 
c  in DIMACS:
 18134 -18135 -18136  0
c  -3 does not represent an automaton state.
c    -( b^{71, 5}_2 ∧  b^{71, 5}_1 ∧  b^{71, 5}_0 ∧ true) 
c  in CNF:
c    -b^{71, 5}_2 ∨ -b^{71, 5}_1 ∨ -b^{71, 5}_0 ∨ false 
c  in DIMACS:
-18134 -18135 -18136  0

c i = 6
c  -2+1 --> -1
c    ( b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧  p_426) -> ( b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0)
c  in CNF:
c    -b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨  b^{71, 7}_2
c    -b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_1
c    -b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨  b^{71, 7}_0
c  in DIMACS:
-18137 -18138  18139 -426  18140 0
-18137 -18138  18139 -426 -18141 0
-18137 -18138  18139 -426  18142 0

c  -1+1 --> 0
c    ( b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0 ∧  p_426) -> (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧ -b^{71, 7}_0)
c  in CNF:
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_2
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_1
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_0
c  in DIMACS:
-18137  18138 -18139 -426 -18140 0
-18137  18138 -18139 -426 -18141 0
-18137  18138 -18139 -426 -18142 0

c  0+1 --> 1
c    (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧  p_426) -> (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0)
c  in CNF:
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_2
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_1
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨  b^{71, 7}_0
c  in DIMACS:
 18137  18138  18139 -426 -18140 0
 18137  18138  18139 -426 -18141 0
 18137  18138  18139 -426  18142 0

c  1+1 --> 2
c    (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0 ∧  p_426) -> (-b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0)
c  in CNF:
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_2
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨  b^{71, 7}_1
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ -p_426 ∨ -b^{71, 7}_0
c  in DIMACS:
 18137  18138 -18139 -426 -18140 0
 18137  18138 -18139 -426  18141 0
 18137  18138 -18139 -426 -18142 0

c  2+1 --> break 
c    (-b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧  p_426) -> break
c  in CNF:
c     b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 18137 -18138  18139 -426 1162 0


c  2-1 --> 1
c    (-b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧ -p_426) -> (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0)
c  in CNF:
c     b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_2
c     b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_1
c     b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨  b^{71, 7}_0
c  in DIMACS:
 18137 -18138  18139  426 -18140 0
 18137 -18138  18139  426 -18141 0
 18137 -18138  18139  426  18142 0

c  1-1 --> 0
c    (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0 ∧ -p_426) -> (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧ -b^{71, 7}_0)
c  in CNF:
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_2
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_1
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_0
c  in DIMACS:
 18137  18138 -18139  426 -18140 0
 18137  18138 -18139  426 -18141 0
 18137  18138 -18139  426 -18142 0

c  0-1 --> -1
c    (-b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧ -p_426) -> ( b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0)
c  in CNF:
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨  b^{71, 7}_2
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_1
c     b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨  b^{71, 7}_0
c  in DIMACS:
 18137  18138  18139  426  18140 0
 18137  18138  18139  426 -18141 0
 18137  18138  18139  426  18142 0

c  -1-1 --> -2
c    ( b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧  b^{71, 6}_0 ∧ -p_426) -> ( b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0)
c  in CNF:
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨  b^{71, 7}_2
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨  b^{71, 7}_1
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨  p_426 ∨ -b^{71, 7}_0
c  in DIMACS:
-18137  18138 -18139  426  18140 0
-18137  18138 -18139  426  18141 0
-18137  18138 -18139  426 -18142 0

c  -2-1 --> break 
c    ( b^{71, 6}_2 ∧  b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨  b^{71, 6}_0 ∨  p_426 ∨ break
c  in DIMACS:
-18137 -18138  18139  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 6}_2 ∧ -b^{71, 6}_1 ∧ -b^{71, 6}_0 ∧ true) 
c  in CNF:
c    -b^{71, 6}_2 ∨  b^{71, 6}_1 ∨  b^{71, 6}_0 ∨ false 
c  in DIMACS:
-18137  18138  18139  0

c  3 does not represent an automaton state.
c    -(-b^{71, 6}_2 ∧  b^{71, 6}_1 ∧  b^{71, 6}_0 ∧ true) 
c  in CNF:
c     b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ false 
c  in DIMACS:
 18137 -18138 -18139  0
c  -3 does not represent an automaton state.
c    -( b^{71, 6}_2 ∧  b^{71, 6}_1 ∧  b^{71, 6}_0 ∧ true) 
c  in CNF:
c    -b^{71, 6}_2 ∨ -b^{71, 6}_1 ∨ -b^{71, 6}_0 ∨ false 
c  in DIMACS:
-18137 -18138 -18139  0

c i = 7
c  -2+1 --> -1
c    ( b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧  p_497) -> ( b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0)
c  in CNF:
c    -b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨  b^{71, 8}_2
c    -b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_1
c    -b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨  b^{71, 8}_0
c  in DIMACS:
-18140 -18141  18142 -497  18143 0
-18140 -18141  18142 -497 -18144 0
-18140 -18141  18142 -497  18145 0

c  -1+1 --> 0
c    ( b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0 ∧  p_497) -> (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧ -b^{71, 8}_0)
c  in CNF:
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_2
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_1
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_0
c  in DIMACS:
-18140  18141 -18142 -497 -18143 0
-18140  18141 -18142 -497 -18144 0
-18140  18141 -18142 -497 -18145 0

c  0+1 --> 1
c    (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧  p_497) -> (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0)
c  in CNF:
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_2
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_1
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨  b^{71, 8}_0
c  in DIMACS:
 18140  18141  18142 -497 -18143 0
 18140  18141  18142 -497 -18144 0
 18140  18141  18142 -497  18145 0

c  1+1 --> 2
c    (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0 ∧  p_497) -> (-b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0)
c  in CNF:
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_2
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨  b^{71, 8}_1
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ -p_497 ∨ -b^{71, 8}_0
c  in DIMACS:
 18140  18141 -18142 -497 -18143 0
 18140  18141 -18142 -497  18144 0
 18140  18141 -18142 -497 -18145 0

c  2+1 --> break 
c    (-b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧  p_497) -> break
c  in CNF:
c     b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ -p_497 ∨ break
c  in DIMACS:
 18140 -18141  18142 -497 1162 0


c  2-1 --> 1
c    (-b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧ -p_497) -> (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0)
c  in CNF:
c     b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_2
c     b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_1
c     b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨  b^{71, 8}_0
c  in DIMACS:
 18140 -18141  18142  497 -18143 0
 18140 -18141  18142  497 -18144 0
 18140 -18141  18142  497  18145 0

c  1-1 --> 0
c    (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0 ∧ -p_497) -> (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧ -b^{71, 8}_0)
c  in CNF:
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_2
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_1
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_0
c  in DIMACS:
 18140  18141 -18142  497 -18143 0
 18140  18141 -18142  497 -18144 0
 18140  18141 -18142  497 -18145 0

c  0-1 --> -1
c    (-b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧ -p_497) -> ( b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0)
c  in CNF:
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨  b^{71, 8}_2
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_1
c     b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨  b^{71, 8}_0
c  in DIMACS:
 18140  18141  18142  497  18143 0
 18140  18141  18142  497 -18144 0
 18140  18141  18142  497  18145 0

c  -1-1 --> -2
c    ( b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧  b^{71, 7}_0 ∧ -p_497) -> ( b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0)
c  in CNF:
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨  b^{71, 8}_2
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨  b^{71, 8}_1
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨  p_497 ∨ -b^{71, 8}_0
c  in DIMACS:
-18140  18141 -18142  497  18143 0
-18140  18141 -18142  497  18144 0
-18140  18141 -18142  497 -18145 0

c  -2-1 --> break 
c    ( b^{71, 7}_2 ∧  b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧ -p_497) -> break
c  in CNF:
c    -b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨  b^{71, 7}_0 ∨  p_497 ∨ break
c  in DIMACS:
-18140 -18141  18142  497 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 7}_2 ∧ -b^{71, 7}_1 ∧ -b^{71, 7}_0 ∧ true) 
c  in CNF:
c    -b^{71, 7}_2 ∨  b^{71, 7}_1 ∨  b^{71, 7}_0 ∨ false 
c  in DIMACS:
-18140  18141  18142  0

c  3 does not represent an automaton state.
c    -(-b^{71, 7}_2 ∧  b^{71, 7}_1 ∧  b^{71, 7}_0 ∧ true) 
c  in CNF:
c     b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ false 
c  in DIMACS:
 18140 -18141 -18142  0
c  -3 does not represent an automaton state.
c    -( b^{71, 7}_2 ∧  b^{71, 7}_1 ∧  b^{71, 7}_0 ∧ true) 
c  in CNF:
c    -b^{71, 7}_2 ∨ -b^{71, 7}_1 ∨ -b^{71, 7}_0 ∨ false 
c  in DIMACS:
-18140 -18141 -18142  0

c i = 8
c  -2+1 --> -1
c    ( b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧  p_568) -> ( b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0)
c  in CNF:
c    -b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨  b^{71, 9}_2
c    -b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_1
c    -b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨  b^{71, 9}_0
c  in DIMACS:
-18143 -18144  18145 -568  18146 0
-18143 -18144  18145 -568 -18147 0
-18143 -18144  18145 -568  18148 0

c  -1+1 --> 0
c    ( b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0 ∧  p_568) -> (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧ -b^{71, 9}_0)
c  in CNF:
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_2
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_1
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_0
c  in DIMACS:
-18143  18144 -18145 -568 -18146 0
-18143  18144 -18145 -568 -18147 0
-18143  18144 -18145 -568 -18148 0

c  0+1 --> 1
c    (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧  p_568) -> (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0)
c  in CNF:
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_2
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_1
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨  b^{71, 9}_0
c  in DIMACS:
 18143  18144  18145 -568 -18146 0
 18143  18144  18145 -568 -18147 0
 18143  18144  18145 -568  18148 0

c  1+1 --> 2
c    (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0 ∧  p_568) -> (-b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0)
c  in CNF:
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_2
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨  b^{71, 9}_1
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ -p_568 ∨ -b^{71, 9}_0
c  in DIMACS:
 18143  18144 -18145 -568 -18146 0
 18143  18144 -18145 -568  18147 0
 18143  18144 -18145 -568 -18148 0

c  2+1 --> break 
c    (-b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧  p_568) -> break
c  in CNF:
c     b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 18143 -18144  18145 -568 1162 0


c  2-1 --> 1
c    (-b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧ -p_568) -> (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0)
c  in CNF:
c     b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_2
c     b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_1
c     b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨  b^{71, 9}_0
c  in DIMACS:
 18143 -18144  18145  568 -18146 0
 18143 -18144  18145  568 -18147 0
 18143 -18144  18145  568  18148 0

c  1-1 --> 0
c    (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0 ∧ -p_568) -> (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧ -b^{71, 9}_0)
c  in CNF:
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_2
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_1
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_0
c  in DIMACS:
 18143  18144 -18145  568 -18146 0
 18143  18144 -18145  568 -18147 0
 18143  18144 -18145  568 -18148 0

c  0-1 --> -1
c    (-b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧ -p_568) -> ( b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0)
c  in CNF:
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨  b^{71, 9}_2
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_1
c     b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨  b^{71, 9}_0
c  in DIMACS:
 18143  18144  18145  568  18146 0
 18143  18144  18145  568 -18147 0
 18143  18144  18145  568  18148 0

c  -1-1 --> -2
c    ( b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧  b^{71, 8}_0 ∧ -p_568) -> ( b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0)
c  in CNF:
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨  b^{71, 9}_2
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨  b^{71, 9}_1
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨  p_568 ∨ -b^{71, 9}_0
c  in DIMACS:
-18143  18144 -18145  568  18146 0
-18143  18144 -18145  568  18147 0
-18143  18144 -18145  568 -18148 0

c  -2-1 --> break 
c    ( b^{71, 8}_2 ∧  b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨  b^{71, 8}_0 ∨  p_568 ∨ break
c  in DIMACS:
-18143 -18144  18145  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 8}_2 ∧ -b^{71, 8}_1 ∧ -b^{71, 8}_0 ∧ true) 
c  in CNF:
c    -b^{71, 8}_2 ∨  b^{71, 8}_1 ∨  b^{71, 8}_0 ∨ false 
c  in DIMACS:
-18143  18144  18145  0

c  3 does not represent an automaton state.
c    -(-b^{71, 8}_2 ∧  b^{71, 8}_1 ∧  b^{71, 8}_0 ∧ true) 
c  in CNF:
c     b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ false 
c  in DIMACS:
 18143 -18144 -18145  0
c  -3 does not represent an automaton state.
c    -( b^{71, 8}_2 ∧  b^{71, 8}_1 ∧  b^{71, 8}_0 ∧ true) 
c  in CNF:
c    -b^{71, 8}_2 ∨ -b^{71, 8}_1 ∨ -b^{71, 8}_0 ∨ false 
c  in DIMACS:
-18143 -18144 -18145  0

c i = 9
c  -2+1 --> -1
c    ( b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧  p_639) -> ( b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0)
c  in CNF:
c    -b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨  b^{71, 10}_2
c    -b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_1
c    -b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨  b^{71, 10}_0
c  in DIMACS:
-18146 -18147  18148 -639  18149 0
-18146 -18147  18148 -639 -18150 0
-18146 -18147  18148 -639  18151 0

c  -1+1 --> 0
c    ( b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0 ∧  p_639) -> (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧ -b^{71, 10}_0)
c  in CNF:
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_2
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_1
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_0
c  in DIMACS:
-18146  18147 -18148 -639 -18149 0
-18146  18147 -18148 -639 -18150 0
-18146  18147 -18148 -639 -18151 0

c  0+1 --> 1
c    (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧  p_639) -> (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0)
c  in CNF:
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_2
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_1
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨  b^{71, 10}_0
c  in DIMACS:
 18146  18147  18148 -639 -18149 0
 18146  18147  18148 -639 -18150 0
 18146  18147  18148 -639  18151 0

c  1+1 --> 2
c    (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0 ∧  p_639) -> (-b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0)
c  in CNF:
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_2
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨  b^{71, 10}_1
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ -p_639 ∨ -b^{71, 10}_0
c  in DIMACS:
 18146  18147 -18148 -639 -18149 0
 18146  18147 -18148 -639  18150 0
 18146  18147 -18148 -639 -18151 0

c  2+1 --> break 
c    (-b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧  p_639) -> break
c  in CNF:
c     b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ -p_639 ∨ break
c  in DIMACS:
 18146 -18147  18148 -639 1162 0


c  2-1 --> 1
c    (-b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧ -p_639) -> (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0)
c  in CNF:
c     b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_2
c     b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_1
c     b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨  b^{71, 10}_0
c  in DIMACS:
 18146 -18147  18148  639 -18149 0
 18146 -18147  18148  639 -18150 0
 18146 -18147  18148  639  18151 0

c  1-1 --> 0
c    (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0 ∧ -p_639) -> (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧ -b^{71, 10}_0)
c  in CNF:
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_2
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_1
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_0
c  in DIMACS:
 18146  18147 -18148  639 -18149 0
 18146  18147 -18148  639 -18150 0
 18146  18147 -18148  639 -18151 0

c  0-1 --> -1
c    (-b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧ -p_639) -> ( b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0)
c  in CNF:
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨  b^{71, 10}_2
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_1
c     b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨  b^{71, 10}_0
c  in DIMACS:
 18146  18147  18148  639  18149 0
 18146  18147  18148  639 -18150 0
 18146  18147  18148  639  18151 0

c  -1-1 --> -2
c    ( b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧  b^{71, 9}_0 ∧ -p_639) -> ( b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0)
c  in CNF:
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨  b^{71, 10}_2
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨  b^{71, 10}_1
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨  p_639 ∨ -b^{71, 10}_0
c  in DIMACS:
-18146  18147 -18148  639  18149 0
-18146  18147 -18148  639  18150 0
-18146  18147 -18148  639 -18151 0

c  -2-1 --> break 
c    ( b^{71, 9}_2 ∧  b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧ -p_639) -> break
c  in CNF:
c    -b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨  b^{71, 9}_0 ∨  p_639 ∨ break
c  in DIMACS:
-18146 -18147  18148  639 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 9}_2 ∧ -b^{71, 9}_1 ∧ -b^{71, 9}_0 ∧ true) 
c  in CNF:
c    -b^{71, 9}_2 ∨  b^{71, 9}_1 ∨  b^{71, 9}_0 ∨ false 
c  in DIMACS:
-18146  18147  18148  0

c  3 does not represent an automaton state.
c    -(-b^{71, 9}_2 ∧  b^{71, 9}_1 ∧  b^{71, 9}_0 ∧ true) 
c  in CNF:
c     b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ false 
c  in DIMACS:
 18146 -18147 -18148  0
c  -3 does not represent an automaton state.
c    -( b^{71, 9}_2 ∧  b^{71, 9}_1 ∧  b^{71, 9}_0 ∧ true) 
c  in CNF:
c    -b^{71, 9}_2 ∨ -b^{71, 9}_1 ∨ -b^{71, 9}_0 ∨ false 
c  in DIMACS:
-18146 -18147 -18148  0

c i = 10
c  -2+1 --> -1
c    ( b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧  p_710) -> ( b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0)
c  in CNF:
c    -b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨  b^{71, 11}_2
c    -b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_1
c    -b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨  b^{71, 11}_0
c  in DIMACS:
-18149 -18150  18151 -710  18152 0
-18149 -18150  18151 -710 -18153 0
-18149 -18150  18151 -710  18154 0

c  -1+1 --> 0
c    ( b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0 ∧  p_710) -> (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧ -b^{71, 11}_0)
c  in CNF:
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_2
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_1
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_0
c  in DIMACS:
-18149  18150 -18151 -710 -18152 0
-18149  18150 -18151 -710 -18153 0
-18149  18150 -18151 -710 -18154 0

c  0+1 --> 1
c    (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧  p_710) -> (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0)
c  in CNF:
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_2
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_1
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨  b^{71, 11}_0
c  in DIMACS:
 18149  18150  18151 -710 -18152 0
 18149  18150  18151 -710 -18153 0
 18149  18150  18151 -710  18154 0

c  1+1 --> 2
c    (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0 ∧  p_710) -> (-b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0)
c  in CNF:
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_2
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨  b^{71, 11}_1
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ -p_710 ∨ -b^{71, 11}_0
c  in DIMACS:
 18149  18150 -18151 -710 -18152 0
 18149  18150 -18151 -710  18153 0
 18149  18150 -18151 -710 -18154 0

c  2+1 --> break 
c    (-b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧  p_710) -> break
c  in CNF:
c     b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 18149 -18150  18151 -710 1162 0


c  2-1 --> 1
c    (-b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧ -p_710) -> (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0)
c  in CNF:
c     b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_2
c     b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_1
c     b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨  b^{71, 11}_0
c  in DIMACS:
 18149 -18150  18151  710 -18152 0
 18149 -18150  18151  710 -18153 0
 18149 -18150  18151  710  18154 0

c  1-1 --> 0
c    (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0 ∧ -p_710) -> (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧ -b^{71, 11}_0)
c  in CNF:
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_2
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_1
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_0
c  in DIMACS:
 18149  18150 -18151  710 -18152 0
 18149  18150 -18151  710 -18153 0
 18149  18150 -18151  710 -18154 0

c  0-1 --> -1
c    (-b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧ -p_710) -> ( b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0)
c  in CNF:
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨  b^{71, 11}_2
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_1
c     b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨  b^{71, 11}_0
c  in DIMACS:
 18149  18150  18151  710  18152 0
 18149  18150  18151  710 -18153 0
 18149  18150  18151  710  18154 0

c  -1-1 --> -2
c    ( b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧  b^{71, 10}_0 ∧ -p_710) -> ( b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0)
c  in CNF:
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨  b^{71, 11}_2
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨  b^{71, 11}_1
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨  p_710 ∨ -b^{71, 11}_0
c  in DIMACS:
-18149  18150 -18151  710  18152 0
-18149  18150 -18151  710  18153 0
-18149  18150 -18151  710 -18154 0

c  -2-1 --> break 
c    ( b^{71, 10}_2 ∧  b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨  b^{71, 10}_0 ∨  p_710 ∨ break
c  in DIMACS:
-18149 -18150  18151  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 10}_2 ∧ -b^{71, 10}_1 ∧ -b^{71, 10}_0 ∧ true) 
c  in CNF:
c    -b^{71, 10}_2 ∨  b^{71, 10}_1 ∨  b^{71, 10}_0 ∨ false 
c  in DIMACS:
-18149  18150  18151  0

c  3 does not represent an automaton state.
c    -(-b^{71, 10}_2 ∧  b^{71, 10}_1 ∧  b^{71, 10}_0 ∧ true) 
c  in CNF:
c     b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ false 
c  in DIMACS:
 18149 -18150 -18151  0
c  -3 does not represent an automaton state.
c    -( b^{71, 10}_2 ∧  b^{71, 10}_1 ∧  b^{71, 10}_0 ∧ true) 
c  in CNF:
c    -b^{71, 10}_2 ∨ -b^{71, 10}_1 ∨ -b^{71, 10}_0 ∨ false 
c  in DIMACS:
-18149 -18150 -18151  0

c i = 11
c  -2+1 --> -1
c    ( b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧  p_781) -> ( b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0)
c  in CNF:
c    -b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨  b^{71, 12}_2
c    -b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_1
c    -b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨  b^{71, 12}_0
c  in DIMACS:
-18152 -18153  18154 -781  18155 0
-18152 -18153  18154 -781 -18156 0
-18152 -18153  18154 -781  18157 0

c  -1+1 --> 0
c    ( b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0 ∧  p_781) -> (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧ -b^{71, 12}_0)
c  in CNF:
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_2
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_1
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_0
c  in DIMACS:
-18152  18153 -18154 -781 -18155 0
-18152  18153 -18154 -781 -18156 0
-18152  18153 -18154 -781 -18157 0

c  0+1 --> 1
c    (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧  p_781) -> (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0)
c  in CNF:
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_2
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_1
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨  b^{71, 12}_0
c  in DIMACS:
 18152  18153  18154 -781 -18155 0
 18152  18153  18154 -781 -18156 0
 18152  18153  18154 -781  18157 0

c  1+1 --> 2
c    (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0 ∧  p_781) -> (-b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0)
c  in CNF:
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_2
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨  b^{71, 12}_1
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ -p_781 ∨ -b^{71, 12}_0
c  in DIMACS:
 18152  18153 -18154 -781 -18155 0
 18152  18153 -18154 -781  18156 0
 18152  18153 -18154 -781 -18157 0

c  2+1 --> break 
c    (-b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧  p_781) -> break
c  in CNF:
c     b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ -p_781 ∨ break
c  in DIMACS:
 18152 -18153  18154 -781 1162 0


c  2-1 --> 1
c    (-b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧ -p_781) -> (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0)
c  in CNF:
c     b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_2
c     b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_1
c     b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨  b^{71, 12}_0
c  in DIMACS:
 18152 -18153  18154  781 -18155 0
 18152 -18153  18154  781 -18156 0
 18152 -18153  18154  781  18157 0

c  1-1 --> 0
c    (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0 ∧ -p_781) -> (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧ -b^{71, 12}_0)
c  in CNF:
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_2
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_1
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_0
c  in DIMACS:
 18152  18153 -18154  781 -18155 0
 18152  18153 -18154  781 -18156 0
 18152  18153 -18154  781 -18157 0

c  0-1 --> -1
c    (-b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧ -p_781) -> ( b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0)
c  in CNF:
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨  b^{71, 12}_2
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_1
c     b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨  b^{71, 12}_0
c  in DIMACS:
 18152  18153  18154  781  18155 0
 18152  18153  18154  781 -18156 0
 18152  18153  18154  781  18157 0

c  -1-1 --> -2
c    ( b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧  b^{71, 11}_0 ∧ -p_781) -> ( b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0)
c  in CNF:
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨  b^{71, 12}_2
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨  b^{71, 12}_1
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨  p_781 ∨ -b^{71, 12}_0
c  in DIMACS:
-18152  18153 -18154  781  18155 0
-18152  18153 -18154  781  18156 0
-18152  18153 -18154  781 -18157 0

c  -2-1 --> break 
c    ( b^{71, 11}_2 ∧  b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧ -p_781) -> break
c  in CNF:
c    -b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨  b^{71, 11}_0 ∨  p_781 ∨ break
c  in DIMACS:
-18152 -18153  18154  781 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 11}_2 ∧ -b^{71, 11}_1 ∧ -b^{71, 11}_0 ∧ true) 
c  in CNF:
c    -b^{71, 11}_2 ∨  b^{71, 11}_1 ∨  b^{71, 11}_0 ∨ false 
c  in DIMACS:
-18152  18153  18154  0

c  3 does not represent an automaton state.
c    -(-b^{71, 11}_2 ∧  b^{71, 11}_1 ∧  b^{71, 11}_0 ∧ true) 
c  in CNF:
c     b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ false 
c  in DIMACS:
 18152 -18153 -18154  0
c  -3 does not represent an automaton state.
c    -( b^{71, 11}_2 ∧  b^{71, 11}_1 ∧  b^{71, 11}_0 ∧ true) 
c  in CNF:
c    -b^{71, 11}_2 ∨ -b^{71, 11}_1 ∨ -b^{71, 11}_0 ∨ false 
c  in DIMACS:
-18152 -18153 -18154  0

c i = 12
c  -2+1 --> -1
c    ( b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧  p_852) -> ( b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0)
c  in CNF:
c    -b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨  b^{71, 13}_2
c    -b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_1
c    -b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨  b^{71, 13}_0
c  in DIMACS:
-18155 -18156  18157 -852  18158 0
-18155 -18156  18157 -852 -18159 0
-18155 -18156  18157 -852  18160 0

c  -1+1 --> 0
c    ( b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0 ∧  p_852) -> (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧ -b^{71, 13}_0)
c  in CNF:
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_2
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_1
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_0
c  in DIMACS:
-18155  18156 -18157 -852 -18158 0
-18155  18156 -18157 -852 -18159 0
-18155  18156 -18157 -852 -18160 0

c  0+1 --> 1
c    (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧  p_852) -> (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0)
c  in CNF:
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_2
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_1
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨  b^{71, 13}_0
c  in DIMACS:
 18155  18156  18157 -852 -18158 0
 18155  18156  18157 -852 -18159 0
 18155  18156  18157 -852  18160 0

c  1+1 --> 2
c    (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0 ∧  p_852) -> (-b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0)
c  in CNF:
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_2
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨  b^{71, 13}_1
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ -p_852 ∨ -b^{71, 13}_0
c  in DIMACS:
 18155  18156 -18157 -852 -18158 0
 18155  18156 -18157 -852  18159 0
 18155  18156 -18157 -852 -18160 0

c  2+1 --> break 
c    (-b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧  p_852) -> break
c  in CNF:
c     b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 18155 -18156  18157 -852 1162 0


c  2-1 --> 1
c    (-b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧ -p_852) -> (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0)
c  in CNF:
c     b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_2
c     b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_1
c     b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨  b^{71, 13}_0
c  in DIMACS:
 18155 -18156  18157  852 -18158 0
 18155 -18156  18157  852 -18159 0
 18155 -18156  18157  852  18160 0

c  1-1 --> 0
c    (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0 ∧ -p_852) -> (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧ -b^{71, 13}_0)
c  in CNF:
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_2
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_1
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_0
c  in DIMACS:
 18155  18156 -18157  852 -18158 0
 18155  18156 -18157  852 -18159 0
 18155  18156 -18157  852 -18160 0

c  0-1 --> -1
c    (-b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧ -p_852) -> ( b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0)
c  in CNF:
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨  b^{71, 13}_2
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_1
c     b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨  b^{71, 13}_0
c  in DIMACS:
 18155  18156  18157  852  18158 0
 18155  18156  18157  852 -18159 0
 18155  18156  18157  852  18160 0

c  -1-1 --> -2
c    ( b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧  b^{71, 12}_0 ∧ -p_852) -> ( b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0)
c  in CNF:
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨  b^{71, 13}_2
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨  b^{71, 13}_1
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨  p_852 ∨ -b^{71, 13}_0
c  in DIMACS:
-18155  18156 -18157  852  18158 0
-18155  18156 -18157  852  18159 0
-18155  18156 -18157  852 -18160 0

c  -2-1 --> break 
c    ( b^{71, 12}_2 ∧  b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨  b^{71, 12}_0 ∨  p_852 ∨ break
c  in DIMACS:
-18155 -18156  18157  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 12}_2 ∧ -b^{71, 12}_1 ∧ -b^{71, 12}_0 ∧ true) 
c  in CNF:
c    -b^{71, 12}_2 ∨  b^{71, 12}_1 ∨  b^{71, 12}_0 ∨ false 
c  in DIMACS:
-18155  18156  18157  0

c  3 does not represent an automaton state.
c    -(-b^{71, 12}_2 ∧  b^{71, 12}_1 ∧  b^{71, 12}_0 ∧ true) 
c  in CNF:
c     b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ false 
c  in DIMACS:
 18155 -18156 -18157  0
c  -3 does not represent an automaton state.
c    -( b^{71, 12}_2 ∧  b^{71, 12}_1 ∧  b^{71, 12}_0 ∧ true) 
c  in CNF:
c    -b^{71, 12}_2 ∨ -b^{71, 12}_1 ∨ -b^{71, 12}_0 ∨ false 
c  in DIMACS:
-18155 -18156 -18157  0

c i = 13
c  -2+1 --> -1
c    ( b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧  p_923) -> ( b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0)
c  in CNF:
c    -b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨  b^{71, 14}_2
c    -b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_1
c    -b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨  b^{71, 14}_0
c  in DIMACS:
-18158 -18159  18160 -923  18161 0
-18158 -18159  18160 -923 -18162 0
-18158 -18159  18160 -923  18163 0

c  -1+1 --> 0
c    ( b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0 ∧  p_923) -> (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧ -b^{71, 14}_0)
c  in CNF:
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_2
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_1
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_0
c  in DIMACS:
-18158  18159 -18160 -923 -18161 0
-18158  18159 -18160 -923 -18162 0
-18158  18159 -18160 -923 -18163 0

c  0+1 --> 1
c    (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧  p_923) -> (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0)
c  in CNF:
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_2
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_1
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨  b^{71, 14}_0
c  in DIMACS:
 18158  18159  18160 -923 -18161 0
 18158  18159  18160 -923 -18162 0
 18158  18159  18160 -923  18163 0

c  1+1 --> 2
c    (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0 ∧  p_923) -> (-b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0)
c  in CNF:
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_2
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨  b^{71, 14}_1
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ -p_923 ∨ -b^{71, 14}_0
c  in DIMACS:
 18158  18159 -18160 -923 -18161 0
 18158  18159 -18160 -923  18162 0
 18158  18159 -18160 -923 -18163 0

c  2+1 --> break 
c    (-b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧  p_923) -> break
c  in CNF:
c     b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ -p_923 ∨ break
c  in DIMACS:
 18158 -18159  18160 -923 1162 0


c  2-1 --> 1
c    (-b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧ -p_923) -> (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0)
c  in CNF:
c     b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_2
c     b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_1
c     b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨  b^{71, 14}_0
c  in DIMACS:
 18158 -18159  18160  923 -18161 0
 18158 -18159  18160  923 -18162 0
 18158 -18159  18160  923  18163 0

c  1-1 --> 0
c    (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0 ∧ -p_923) -> (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧ -b^{71, 14}_0)
c  in CNF:
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_2
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_1
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_0
c  in DIMACS:
 18158  18159 -18160  923 -18161 0
 18158  18159 -18160  923 -18162 0
 18158  18159 -18160  923 -18163 0

c  0-1 --> -1
c    (-b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧ -p_923) -> ( b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0)
c  in CNF:
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨  b^{71, 14}_2
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_1
c     b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨  b^{71, 14}_0
c  in DIMACS:
 18158  18159  18160  923  18161 0
 18158  18159  18160  923 -18162 0
 18158  18159  18160  923  18163 0

c  -1-1 --> -2
c    ( b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧  b^{71, 13}_0 ∧ -p_923) -> ( b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0)
c  in CNF:
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨  b^{71, 14}_2
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨  b^{71, 14}_1
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨  p_923 ∨ -b^{71, 14}_0
c  in DIMACS:
-18158  18159 -18160  923  18161 0
-18158  18159 -18160  923  18162 0
-18158  18159 -18160  923 -18163 0

c  -2-1 --> break 
c    ( b^{71, 13}_2 ∧  b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧ -p_923) -> break
c  in CNF:
c    -b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨  b^{71, 13}_0 ∨  p_923 ∨ break
c  in DIMACS:
-18158 -18159  18160  923 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 13}_2 ∧ -b^{71, 13}_1 ∧ -b^{71, 13}_0 ∧ true) 
c  in CNF:
c    -b^{71, 13}_2 ∨  b^{71, 13}_1 ∨  b^{71, 13}_0 ∨ false 
c  in DIMACS:
-18158  18159  18160  0

c  3 does not represent an automaton state.
c    -(-b^{71, 13}_2 ∧  b^{71, 13}_1 ∧  b^{71, 13}_0 ∧ true) 
c  in CNF:
c     b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ false 
c  in DIMACS:
 18158 -18159 -18160  0
c  -3 does not represent an automaton state.
c    -( b^{71, 13}_2 ∧  b^{71, 13}_1 ∧  b^{71, 13}_0 ∧ true) 
c  in CNF:
c    -b^{71, 13}_2 ∨ -b^{71, 13}_1 ∨ -b^{71, 13}_0 ∨ false 
c  in DIMACS:
-18158 -18159 -18160  0

c i = 14
c  -2+1 --> -1
c    ( b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧  p_994) -> ( b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0)
c  in CNF:
c    -b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨  b^{71, 15}_2
c    -b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_1
c    -b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨  b^{71, 15}_0
c  in DIMACS:
-18161 -18162  18163 -994  18164 0
-18161 -18162  18163 -994 -18165 0
-18161 -18162  18163 -994  18166 0

c  -1+1 --> 0
c    ( b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0 ∧  p_994) -> (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧ -b^{71, 15}_0)
c  in CNF:
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_2
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_1
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_0
c  in DIMACS:
-18161  18162 -18163 -994 -18164 0
-18161  18162 -18163 -994 -18165 0
-18161  18162 -18163 -994 -18166 0

c  0+1 --> 1
c    (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧  p_994) -> (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0)
c  in CNF:
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_2
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_1
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨  b^{71, 15}_0
c  in DIMACS:
 18161  18162  18163 -994 -18164 0
 18161  18162  18163 -994 -18165 0
 18161  18162  18163 -994  18166 0

c  1+1 --> 2
c    (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0 ∧  p_994) -> (-b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0)
c  in CNF:
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_2
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨  b^{71, 15}_1
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ -p_994 ∨ -b^{71, 15}_0
c  in DIMACS:
 18161  18162 -18163 -994 -18164 0
 18161  18162 -18163 -994  18165 0
 18161  18162 -18163 -994 -18166 0

c  2+1 --> break 
c    (-b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧  p_994) -> break
c  in CNF:
c     b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 18161 -18162  18163 -994 1162 0


c  2-1 --> 1
c    (-b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧ -p_994) -> (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0)
c  in CNF:
c     b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_2
c     b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_1
c     b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨  b^{71, 15}_0
c  in DIMACS:
 18161 -18162  18163  994 -18164 0
 18161 -18162  18163  994 -18165 0
 18161 -18162  18163  994  18166 0

c  1-1 --> 0
c    (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0 ∧ -p_994) -> (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧ -b^{71, 15}_0)
c  in CNF:
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_2
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_1
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_0
c  in DIMACS:
 18161  18162 -18163  994 -18164 0
 18161  18162 -18163  994 -18165 0
 18161  18162 -18163  994 -18166 0

c  0-1 --> -1
c    (-b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧ -p_994) -> ( b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0)
c  in CNF:
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨  b^{71, 15}_2
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_1
c     b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨  b^{71, 15}_0
c  in DIMACS:
 18161  18162  18163  994  18164 0
 18161  18162  18163  994 -18165 0
 18161  18162  18163  994  18166 0

c  -1-1 --> -2
c    ( b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧  b^{71, 14}_0 ∧ -p_994) -> ( b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0)
c  in CNF:
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨  b^{71, 15}_2
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨  b^{71, 15}_1
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨  p_994 ∨ -b^{71, 15}_0
c  in DIMACS:
-18161  18162 -18163  994  18164 0
-18161  18162 -18163  994  18165 0
-18161  18162 -18163  994 -18166 0

c  -2-1 --> break 
c    ( b^{71, 14}_2 ∧  b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨  b^{71, 14}_0 ∨  p_994 ∨ break
c  in DIMACS:
-18161 -18162  18163  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 14}_2 ∧ -b^{71, 14}_1 ∧ -b^{71, 14}_0 ∧ true) 
c  in CNF:
c    -b^{71, 14}_2 ∨  b^{71, 14}_1 ∨  b^{71, 14}_0 ∨ false 
c  in DIMACS:
-18161  18162  18163  0

c  3 does not represent an automaton state.
c    -(-b^{71, 14}_2 ∧  b^{71, 14}_1 ∧  b^{71, 14}_0 ∧ true) 
c  in CNF:
c     b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ false 
c  in DIMACS:
 18161 -18162 -18163  0
c  -3 does not represent an automaton state.
c    -( b^{71, 14}_2 ∧  b^{71, 14}_1 ∧  b^{71, 14}_0 ∧ true) 
c  in CNF:
c    -b^{71, 14}_2 ∨ -b^{71, 14}_1 ∨ -b^{71, 14}_0 ∨ false 
c  in DIMACS:
-18161 -18162 -18163  0

c i = 15
c  -2+1 --> -1
c    ( b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧  p_1065) -> ( b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0)
c  in CNF:
c    -b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨  b^{71, 16}_2
c    -b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_1
c    -b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨  b^{71, 16}_0
c  in DIMACS:
-18164 -18165  18166 -1065  18167 0
-18164 -18165  18166 -1065 -18168 0
-18164 -18165  18166 -1065  18169 0

c  -1+1 --> 0
c    ( b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0 ∧  p_1065) -> (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧ -b^{71, 16}_0)
c  in CNF:
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_2
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_1
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_0
c  in DIMACS:
-18164  18165 -18166 -1065 -18167 0
-18164  18165 -18166 -1065 -18168 0
-18164  18165 -18166 -1065 -18169 0

c  0+1 --> 1
c    (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧  p_1065) -> (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0)
c  in CNF:
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_2
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_1
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨  b^{71, 16}_0
c  in DIMACS:
 18164  18165  18166 -1065 -18167 0
 18164  18165  18166 -1065 -18168 0
 18164  18165  18166 -1065  18169 0

c  1+1 --> 2
c    (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0 ∧  p_1065) -> (-b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0)
c  in CNF:
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_2
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨  b^{71, 16}_1
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ -p_1065 ∨ -b^{71, 16}_0
c  in DIMACS:
 18164  18165 -18166 -1065 -18167 0
 18164  18165 -18166 -1065  18168 0
 18164  18165 -18166 -1065 -18169 0

c  2+1 --> break 
c    (-b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 18164 -18165  18166 -1065 1162 0


c  2-1 --> 1
c    (-b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧ -p_1065) -> (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0)
c  in CNF:
c     b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_2
c     b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_1
c     b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨  b^{71, 16}_0
c  in DIMACS:
 18164 -18165  18166  1065 -18167 0
 18164 -18165  18166  1065 -18168 0
 18164 -18165  18166  1065  18169 0

c  1-1 --> 0
c    (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0 ∧ -p_1065) -> (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧ -b^{71, 16}_0)
c  in CNF:
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_2
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_1
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_0
c  in DIMACS:
 18164  18165 -18166  1065 -18167 0
 18164  18165 -18166  1065 -18168 0
 18164  18165 -18166  1065 -18169 0

c  0-1 --> -1
c    (-b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧ -p_1065) -> ( b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0)
c  in CNF:
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨  b^{71, 16}_2
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_1
c     b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨  b^{71, 16}_0
c  in DIMACS:
 18164  18165  18166  1065  18167 0
 18164  18165  18166  1065 -18168 0
 18164  18165  18166  1065  18169 0

c  -1-1 --> -2
c    ( b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧  b^{71, 15}_0 ∧ -p_1065) -> ( b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0)
c  in CNF:
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨  b^{71, 16}_2
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨  b^{71, 16}_1
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨  p_1065 ∨ -b^{71, 16}_0
c  in DIMACS:
-18164  18165 -18166  1065  18167 0
-18164  18165 -18166  1065  18168 0
-18164  18165 -18166  1065 -18169 0

c  -2-1 --> break 
c    ( b^{71, 15}_2 ∧  b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨  b^{71, 15}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-18164 -18165  18166  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 15}_2 ∧ -b^{71, 15}_1 ∧ -b^{71, 15}_0 ∧ true) 
c  in CNF:
c    -b^{71, 15}_2 ∨  b^{71, 15}_1 ∨  b^{71, 15}_0 ∨ false 
c  in DIMACS:
-18164  18165  18166  0

c  3 does not represent an automaton state.
c    -(-b^{71, 15}_2 ∧  b^{71, 15}_1 ∧  b^{71, 15}_0 ∧ true) 
c  in CNF:
c     b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ false 
c  in DIMACS:
 18164 -18165 -18166  0
c  -3 does not represent an automaton state.
c    -( b^{71, 15}_2 ∧  b^{71, 15}_1 ∧  b^{71, 15}_0 ∧ true) 
c  in CNF:
c    -b^{71, 15}_2 ∨ -b^{71, 15}_1 ∨ -b^{71, 15}_0 ∨ false 
c  in DIMACS:
-18164 -18165 -18166  0

c i = 16
c  -2+1 --> -1
c    ( b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧  p_1136) -> ( b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧  b^{71, 17}_0)
c  in CNF:
c    -b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨  b^{71, 17}_2
c    -b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_1
c    -b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨  b^{71, 17}_0
c  in DIMACS:
-18167 -18168  18169 -1136  18170 0
-18167 -18168  18169 -1136 -18171 0
-18167 -18168  18169 -1136  18172 0

c  -1+1 --> 0
c    ( b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0 ∧  p_1136) -> (-b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧ -b^{71, 17}_0)
c  in CNF:
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_2
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_1
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_0
c  in DIMACS:
-18167  18168 -18169 -1136 -18170 0
-18167  18168 -18169 -1136 -18171 0
-18167  18168 -18169 -1136 -18172 0

c  0+1 --> 1
c    (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧  p_1136) -> (-b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧  b^{71, 17}_0)
c  in CNF:
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_2
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_1
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨  b^{71, 17}_0
c  in DIMACS:
 18167  18168  18169 -1136 -18170 0
 18167  18168  18169 -1136 -18171 0
 18167  18168  18169 -1136  18172 0

c  1+1 --> 2
c    (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0 ∧  p_1136) -> (-b^{71, 17}_2 ∧  b^{71, 17}_1 ∧ -b^{71, 17}_0)
c  in CNF:
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_2
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨  b^{71, 17}_1
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ -p_1136 ∨ -b^{71, 17}_0
c  in DIMACS:
 18167  18168 -18169 -1136 -18170 0
 18167  18168 -18169 -1136  18171 0
 18167  18168 -18169 -1136 -18172 0

c  2+1 --> break 
c    (-b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 18167 -18168  18169 -1136 1162 0


c  2-1 --> 1
c    (-b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧ -p_1136) -> (-b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧  b^{71, 17}_0)
c  in CNF:
c     b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_2
c     b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_1
c     b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨  b^{71, 17}_0
c  in DIMACS:
 18167 -18168  18169  1136 -18170 0
 18167 -18168  18169  1136 -18171 0
 18167 -18168  18169  1136  18172 0

c  1-1 --> 0
c    (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0 ∧ -p_1136) -> (-b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧ -b^{71, 17}_0)
c  in CNF:
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_2
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_1
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_0
c  in DIMACS:
 18167  18168 -18169  1136 -18170 0
 18167  18168 -18169  1136 -18171 0
 18167  18168 -18169  1136 -18172 0

c  0-1 --> -1
c    (-b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧ -p_1136) -> ( b^{71, 17}_2 ∧ -b^{71, 17}_1 ∧  b^{71, 17}_0)
c  in CNF:
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨  b^{71, 17}_2
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_1
c     b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨  b^{71, 17}_0
c  in DIMACS:
 18167  18168  18169  1136  18170 0
 18167  18168  18169  1136 -18171 0
 18167  18168  18169  1136  18172 0

c  -1-1 --> -2
c    ( b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧  b^{71, 16}_0 ∧ -p_1136) -> ( b^{71, 17}_2 ∧  b^{71, 17}_1 ∧ -b^{71, 17}_0)
c  in CNF:
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨  b^{71, 17}_2
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨  b^{71, 17}_1
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨  p_1136 ∨ -b^{71, 17}_0
c  in DIMACS:
-18167  18168 -18169  1136  18170 0
-18167  18168 -18169  1136  18171 0
-18167  18168 -18169  1136 -18172 0

c  -2-1 --> break 
c    ( b^{71, 16}_2 ∧  b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨  b^{71, 16}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-18167 -18168  18169  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{71, 16}_2 ∧ -b^{71, 16}_1 ∧ -b^{71, 16}_0 ∧ true) 
c  in CNF:
c    -b^{71, 16}_2 ∨  b^{71, 16}_1 ∨  b^{71, 16}_0 ∨ false 
c  in DIMACS:
-18167  18168  18169  0

c  3 does not represent an automaton state.
c    -(-b^{71, 16}_2 ∧  b^{71, 16}_1 ∧  b^{71, 16}_0 ∧ true) 
c  in CNF:
c     b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ false 
c  in DIMACS:
 18167 -18168 -18169  0
c  -3 does not represent an automaton state.
c    -( b^{71, 16}_2 ∧  b^{71, 16}_1 ∧  b^{71, 16}_0 ∧ true) 
c  in CNF:
c    -b^{71, 16}_2 ∨ -b^{71, 16}_1 ∨ -b^{71, 16}_0 ∨ false 
c  in DIMACS:
-18167 -18168 -18169  0

c INIT for k = 72
c    -b^{72, 1}_2
c    -b^{72, 1}_1
c    -b^{72, 1}_0
c  in DIMACS:
-18173 0
-18174 0
-18175 0

c Transitions for k = 72
c i = 1
c  -2+1 --> -1
c    ( b^{72, 1}_2 ∧  b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧  p_72) -> ( b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0)
c  in CNF:
c    -b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨  b^{72, 2}_2
c    -b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_1
c    -b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨  b^{72, 2}_0
c  in DIMACS:
-18173 -18174  18175 -72  18176 0
-18173 -18174  18175 -72 -18177 0
-18173 -18174  18175 -72  18178 0

c  -1+1 --> 0
c    ( b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧  b^{72, 1}_0 ∧  p_72) -> (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧ -b^{72, 2}_0)
c  in CNF:
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_2
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_1
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_0
c  in DIMACS:
-18173  18174 -18175 -72 -18176 0
-18173  18174 -18175 -72 -18177 0
-18173  18174 -18175 -72 -18178 0

c  0+1 --> 1
c    (-b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧  p_72) -> (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0)
c  in CNF:
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_2
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_1
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨  b^{72, 2}_0
c  in DIMACS:
 18173  18174  18175 -72 -18176 0
 18173  18174  18175 -72 -18177 0
 18173  18174  18175 -72  18178 0

c  1+1 --> 2
c    (-b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧  b^{72, 1}_0 ∧  p_72) -> (-b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0)
c  in CNF:
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_2
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨  b^{72, 2}_1
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ -p_72 ∨ -b^{72, 2}_0
c  in DIMACS:
 18173  18174 -18175 -72 -18176 0
 18173  18174 -18175 -72  18177 0
 18173  18174 -18175 -72 -18178 0

c  2+1 --> break 
c    (-b^{72, 1}_2 ∧  b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧  p_72) -> break
c  in CNF:
c     b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ -p_72 ∨ break
c  in DIMACS:
 18173 -18174  18175 -72 1162 0


c  2-1 --> 1
c    (-b^{72, 1}_2 ∧  b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧ -p_72) -> (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0)
c  in CNF:
c     b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_2
c     b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_1
c     b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨  b^{72, 2}_0
c  in DIMACS:
 18173 -18174  18175  72 -18176 0
 18173 -18174  18175  72 -18177 0
 18173 -18174  18175  72  18178 0

c  1-1 --> 0
c    (-b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧  b^{72, 1}_0 ∧ -p_72) -> (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧ -b^{72, 2}_0)
c  in CNF:
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_2
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_1
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_0
c  in DIMACS:
 18173  18174 -18175  72 -18176 0
 18173  18174 -18175  72 -18177 0
 18173  18174 -18175  72 -18178 0

c  0-1 --> -1
c    (-b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧ -p_72) -> ( b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0)
c  in CNF:
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨  b^{72, 2}_2
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_1
c     b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨  b^{72, 2}_0
c  in DIMACS:
 18173  18174  18175  72  18176 0
 18173  18174  18175  72 -18177 0
 18173  18174  18175  72  18178 0

c  -1-1 --> -2
c    ( b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧  b^{72, 1}_0 ∧ -p_72) -> ( b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0)
c  in CNF:
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨  b^{72, 2}_2
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨  b^{72, 2}_1
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨  p_72 ∨ -b^{72, 2}_0
c  in DIMACS:
-18173  18174 -18175  72  18176 0
-18173  18174 -18175  72  18177 0
-18173  18174 -18175  72 -18178 0

c  -2-1 --> break 
c    ( b^{72, 1}_2 ∧  b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧ -p_72) -> break
c  in CNF:
c    -b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨  b^{72, 1}_0 ∨  p_72 ∨ break
c  in DIMACS:
-18173 -18174  18175  72 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 1}_2 ∧ -b^{72, 1}_1 ∧ -b^{72, 1}_0 ∧ true) 
c  in CNF:
c    -b^{72, 1}_2 ∨  b^{72, 1}_1 ∨  b^{72, 1}_0 ∨ false 
c  in DIMACS:
-18173  18174  18175  0

c  3 does not represent an automaton state.
c    -(-b^{72, 1}_2 ∧  b^{72, 1}_1 ∧  b^{72, 1}_0 ∧ true) 
c  in CNF:
c     b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ false 
c  in DIMACS:
 18173 -18174 -18175  0
c  -3 does not represent an automaton state.
c    -( b^{72, 1}_2 ∧  b^{72, 1}_1 ∧  b^{72, 1}_0 ∧ true) 
c  in CNF:
c    -b^{72, 1}_2 ∨ -b^{72, 1}_1 ∨ -b^{72, 1}_0 ∨ false 
c  in DIMACS:
-18173 -18174 -18175  0

c i = 2
c  -2+1 --> -1
c    ( b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧  p_144) -> ( b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0)
c  in CNF:
c    -b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨  b^{72, 3}_2
c    -b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_1
c    -b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨  b^{72, 3}_0
c  in DIMACS:
-18176 -18177  18178 -144  18179 0
-18176 -18177  18178 -144 -18180 0
-18176 -18177  18178 -144  18181 0

c  -1+1 --> 0
c    ( b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0 ∧  p_144) -> (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧ -b^{72, 3}_0)
c  in CNF:
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_2
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_1
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_0
c  in DIMACS:
-18176  18177 -18178 -144 -18179 0
-18176  18177 -18178 -144 -18180 0
-18176  18177 -18178 -144 -18181 0

c  0+1 --> 1
c    (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧  p_144) -> (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0)
c  in CNF:
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_2
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_1
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨  b^{72, 3}_0
c  in DIMACS:
 18176  18177  18178 -144 -18179 0
 18176  18177  18178 -144 -18180 0
 18176  18177  18178 -144  18181 0

c  1+1 --> 2
c    (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0 ∧  p_144) -> (-b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0)
c  in CNF:
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_2
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨  b^{72, 3}_1
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ -p_144 ∨ -b^{72, 3}_0
c  in DIMACS:
 18176  18177 -18178 -144 -18179 0
 18176  18177 -18178 -144  18180 0
 18176  18177 -18178 -144 -18181 0

c  2+1 --> break 
c    (-b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧  p_144) -> break
c  in CNF:
c     b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 18176 -18177  18178 -144 1162 0


c  2-1 --> 1
c    (-b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧ -p_144) -> (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0)
c  in CNF:
c     b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_2
c     b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_1
c     b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨  b^{72, 3}_0
c  in DIMACS:
 18176 -18177  18178  144 -18179 0
 18176 -18177  18178  144 -18180 0
 18176 -18177  18178  144  18181 0

c  1-1 --> 0
c    (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0 ∧ -p_144) -> (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧ -b^{72, 3}_0)
c  in CNF:
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_2
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_1
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_0
c  in DIMACS:
 18176  18177 -18178  144 -18179 0
 18176  18177 -18178  144 -18180 0
 18176  18177 -18178  144 -18181 0

c  0-1 --> -1
c    (-b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧ -p_144) -> ( b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0)
c  in CNF:
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨  b^{72, 3}_2
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_1
c     b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨  b^{72, 3}_0
c  in DIMACS:
 18176  18177  18178  144  18179 0
 18176  18177  18178  144 -18180 0
 18176  18177  18178  144  18181 0

c  -1-1 --> -2
c    ( b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧  b^{72, 2}_0 ∧ -p_144) -> ( b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0)
c  in CNF:
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨  b^{72, 3}_2
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨  b^{72, 3}_1
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨  p_144 ∨ -b^{72, 3}_0
c  in DIMACS:
-18176  18177 -18178  144  18179 0
-18176  18177 -18178  144  18180 0
-18176  18177 -18178  144 -18181 0

c  -2-1 --> break 
c    ( b^{72, 2}_2 ∧  b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨  b^{72, 2}_0 ∨  p_144 ∨ break
c  in DIMACS:
-18176 -18177  18178  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 2}_2 ∧ -b^{72, 2}_1 ∧ -b^{72, 2}_0 ∧ true) 
c  in CNF:
c    -b^{72, 2}_2 ∨  b^{72, 2}_1 ∨  b^{72, 2}_0 ∨ false 
c  in DIMACS:
-18176  18177  18178  0

c  3 does not represent an automaton state.
c    -(-b^{72, 2}_2 ∧  b^{72, 2}_1 ∧  b^{72, 2}_0 ∧ true) 
c  in CNF:
c     b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ false 
c  in DIMACS:
 18176 -18177 -18178  0
c  -3 does not represent an automaton state.
c    -( b^{72, 2}_2 ∧  b^{72, 2}_1 ∧  b^{72, 2}_0 ∧ true) 
c  in CNF:
c    -b^{72, 2}_2 ∨ -b^{72, 2}_1 ∨ -b^{72, 2}_0 ∨ false 
c  in DIMACS:
-18176 -18177 -18178  0

c i = 3
c  -2+1 --> -1
c    ( b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧  p_216) -> ( b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0)
c  in CNF:
c    -b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨  b^{72, 4}_2
c    -b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_1
c    -b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨  b^{72, 4}_0
c  in DIMACS:
-18179 -18180  18181 -216  18182 0
-18179 -18180  18181 -216 -18183 0
-18179 -18180  18181 -216  18184 0

c  -1+1 --> 0
c    ( b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0 ∧  p_216) -> (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧ -b^{72, 4}_0)
c  in CNF:
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_2
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_1
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_0
c  in DIMACS:
-18179  18180 -18181 -216 -18182 0
-18179  18180 -18181 -216 -18183 0
-18179  18180 -18181 -216 -18184 0

c  0+1 --> 1
c    (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧  p_216) -> (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0)
c  in CNF:
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_2
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_1
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨  b^{72, 4}_0
c  in DIMACS:
 18179  18180  18181 -216 -18182 0
 18179  18180  18181 -216 -18183 0
 18179  18180  18181 -216  18184 0

c  1+1 --> 2
c    (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0 ∧  p_216) -> (-b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0)
c  in CNF:
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_2
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨  b^{72, 4}_1
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ -p_216 ∨ -b^{72, 4}_0
c  in DIMACS:
 18179  18180 -18181 -216 -18182 0
 18179  18180 -18181 -216  18183 0
 18179  18180 -18181 -216 -18184 0

c  2+1 --> break 
c    (-b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧  p_216) -> break
c  in CNF:
c     b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 18179 -18180  18181 -216 1162 0


c  2-1 --> 1
c    (-b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧ -p_216) -> (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0)
c  in CNF:
c     b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_2
c     b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_1
c     b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨  b^{72, 4}_0
c  in DIMACS:
 18179 -18180  18181  216 -18182 0
 18179 -18180  18181  216 -18183 0
 18179 -18180  18181  216  18184 0

c  1-1 --> 0
c    (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0 ∧ -p_216) -> (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧ -b^{72, 4}_0)
c  in CNF:
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_2
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_1
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_0
c  in DIMACS:
 18179  18180 -18181  216 -18182 0
 18179  18180 -18181  216 -18183 0
 18179  18180 -18181  216 -18184 0

c  0-1 --> -1
c    (-b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧ -p_216) -> ( b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0)
c  in CNF:
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨  b^{72, 4}_2
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_1
c     b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨  b^{72, 4}_0
c  in DIMACS:
 18179  18180  18181  216  18182 0
 18179  18180  18181  216 -18183 0
 18179  18180  18181  216  18184 0

c  -1-1 --> -2
c    ( b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧  b^{72, 3}_0 ∧ -p_216) -> ( b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0)
c  in CNF:
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨  b^{72, 4}_2
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨  b^{72, 4}_1
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨  p_216 ∨ -b^{72, 4}_0
c  in DIMACS:
-18179  18180 -18181  216  18182 0
-18179  18180 -18181  216  18183 0
-18179  18180 -18181  216 -18184 0

c  -2-1 --> break 
c    ( b^{72, 3}_2 ∧  b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨  b^{72, 3}_0 ∨  p_216 ∨ break
c  in DIMACS:
-18179 -18180  18181  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 3}_2 ∧ -b^{72, 3}_1 ∧ -b^{72, 3}_0 ∧ true) 
c  in CNF:
c    -b^{72, 3}_2 ∨  b^{72, 3}_1 ∨  b^{72, 3}_0 ∨ false 
c  in DIMACS:
-18179  18180  18181  0

c  3 does not represent an automaton state.
c    -(-b^{72, 3}_2 ∧  b^{72, 3}_1 ∧  b^{72, 3}_0 ∧ true) 
c  in CNF:
c     b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ false 
c  in DIMACS:
 18179 -18180 -18181  0
c  -3 does not represent an automaton state.
c    -( b^{72, 3}_2 ∧  b^{72, 3}_1 ∧  b^{72, 3}_0 ∧ true) 
c  in CNF:
c    -b^{72, 3}_2 ∨ -b^{72, 3}_1 ∨ -b^{72, 3}_0 ∨ false 
c  in DIMACS:
-18179 -18180 -18181  0

c i = 4
c  -2+1 --> -1
c    ( b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧  p_288) -> ( b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0)
c  in CNF:
c    -b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨  b^{72, 5}_2
c    -b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_1
c    -b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨  b^{72, 5}_0
c  in DIMACS:
-18182 -18183  18184 -288  18185 0
-18182 -18183  18184 -288 -18186 0
-18182 -18183  18184 -288  18187 0

c  -1+1 --> 0
c    ( b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0 ∧  p_288) -> (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧ -b^{72, 5}_0)
c  in CNF:
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_2
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_1
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_0
c  in DIMACS:
-18182  18183 -18184 -288 -18185 0
-18182  18183 -18184 -288 -18186 0
-18182  18183 -18184 -288 -18187 0

c  0+1 --> 1
c    (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧  p_288) -> (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0)
c  in CNF:
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_2
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_1
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨  b^{72, 5}_0
c  in DIMACS:
 18182  18183  18184 -288 -18185 0
 18182  18183  18184 -288 -18186 0
 18182  18183  18184 -288  18187 0

c  1+1 --> 2
c    (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0 ∧  p_288) -> (-b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0)
c  in CNF:
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_2
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨  b^{72, 5}_1
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ -p_288 ∨ -b^{72, 5}_0
c  in DIMACS:
 18182  18183 -18184 -288 -18185 0
 18182  18183 -18184 -288  18186 0
 18182  18183 -18184 -288 -18187 0

c  2+1 --> break 
c    (-b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧  p_288) -> break
c  in CNF:
c     b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 18182 -18183  18184 -288 1162 0


c  2-1 --> 1
c    (-b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧ -p_288) -> (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0)
c  in CNF:
c     b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_2
c     b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_1
c     b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨  b^{72, 5}_0
c  in DIMACS:
 18182 -18183  18184  288 -18185 0
 18182 -18183  18184  288 -18186 0
 18182 -18183  18184  288  18187 0

c  1-1 --> 0
c    (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0 ∧ -p_288) -> (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧ -b^{72, 5}_0)
c  in CNF:
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_2
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_1
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_0
c  in DIMACS:
 18182  18183 -18184  288 -18185 0
 18182  18183 -18184  288 -18186 0
 18182  18183 -18184  288 -18187 0

c  0-1 --> -1
c    (-b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧ -p_288) -> ( b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0)
c  in CNF:
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨  b^{72, 5}_2
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_1
c     b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨  b^{72, 5}_0
c  in DIMACS:
 18182  18183  18184  288  18185 0
 18182  18183  18184  288 -18186 0
 18182  18183  18184  288  18187 0

c  -1-1 --> -2
c    ( b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧  b^{72, 4}_0 ∧ -p_288) -> ( b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0)
c  in CNF:
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨  b^{72, 5}_2
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨  b^{72, 5}_1
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨  p_288 ∨ -b^{72, 5}_0
c  in DIMACS:
-18182  18183 -18184  288  18185 0
-18182  18183 -18184  288  18186 0
-18182  18183 -18184  288 -18187 0

c  -2-1 --> break 
c    ( b^{72, 4}_2 ∧  b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨  b^{72, 4}_0 ∨  p_288 ∨ break
c  in DIMACS:
-18182 -18183  18184  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 4}_2 ∧ -b^{72, 4}_1 ∧ -b^{72, 4}_0 ∧ true) 
c  in CNF:
c    -b^{72, 4}_2 ∨  b^{72, 4}_1 ∨  b^{72, 4}_0 ∨ false 
c  in DIMACS:
-18182  18183  18184  0

c  3 does not represent an automaton state.
c    -(-b^{72, 4}_2 ∧  b^{72, 4}_1 ∧  b^{72, 4}_0 ∧ true) 
c  in CNF:
c     b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ false 
c  in DIMACS:
 18182 -18183 -18184  0
c  -3 does not represent an automaton state.
c    -( b^{72, 4}_2 ∧  b^{72, 4}_1 ∧  b^{72, 4}_0 ∧ true) 
c  in CNF:
c    -b^{72, 4}_2 ∨ -b^{72, 4}_1 ∨ -b^{72, 4}_0 ∨ false 
c  in DIMACS:
-18182 -18183 -18184  0

c i = 5
c  -2+1 --> -1
c    ( b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧  p_360) -> ( b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0)
c  in CNF:
c    -b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨  b^{72, 6}_2
c    -b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_1
c    -b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨  b^{72, 6}_0
c  in DIMACS:
-18185 -18186  18187 -360  18188 0
-18185 -18186  18187 -360 -18189 0
-18185 -18186  18187 -360  18190 0

c  -1+1 --> 0
c    ( b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0 ∧  p_360) -> (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧ -b^{72, 6}_0)
c  in CNF:
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_2
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_1
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_0
c  in DIMACS:
-18185  18186 -18187 -360 -18188 0
-18185  18186 -18187 -360 -18189 0
-18185  18186 -18187 -360 -18190 0

c  0+1 --> 1
c    (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧  p_360) -> (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0)
c  in CNF:
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_2
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_1
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨  b^{72, 6}_0
c  in DIMACS:
 18185  18186  18187 -360 -18188 0
 18185  18186  18187 -360 -18189 0
 18185  18186  18187 -360  18190 0

c  1+1 --> 2
c    (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0 ∧  p_360) -> (-b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0)
c  in CNF:
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_2
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨  b^{72, 6}_1
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ -p_360 ∨ -b^{72, 6}_0
c  in DIMACS:
 18185  18186 -18187 -360 -18188 0
 18185  18186 -18187 -360  18189 0
 18185  18186 -18187 -360 -18190 0

c  2+1 --> break 
c    (-b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧  p_360) -> break
c  in CNF:
c     b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 18185 -18186  18187 -360 1162 0


c  2-1 --> 1
c    (-b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧ -p_360) -> (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0)
c  in CNF:
c     b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_2
c     b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_1
c     b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨  b^{72, 6}_0
c  in DIMACS:
 18185 -18186  18187  360 -18188 0
 18185 -18186  18187  360 -18189 0
 18185 -18186  18187  360  18190 0

c  1-1 --> 0
c    (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0 ∧ -p_360) -> (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧ -b^{72, 6}_0)
c  in CNF:
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_2
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_1
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_0
c  in DIMACS:
 18185  18186 -18187  360 -18188 0
 18185  18186 -18187  360 -18189 0
 18185  18186 -18187  360 -18190 0

c  0-1 --> -1
c    (-b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧ -p_360) -> ( b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0)
c  in CNF:
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨  b^{72, 6}_2
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_1
c     b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨  b^{72, 6}_0
c  in DIMACS:
 18185  18186  18187  360  18188 0
 18185  18186  18187  360 -18189 0
 18185  18186  18187  360  18190 0

c  -1-1 --> -2
c    ( b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧  b^{72, 5}_0 ∧ -p_360) -> ( b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0)
c  in CNF:
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨  b^{72, 6}_2
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨  b^{72, 6}_1
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨  p_360 ∨ -b^{72, 6}_0
c  in DIMACS:
-18185  18186 -18187  360  18188 0
-18185  18186 -18187  360  18189 0
-18185  18186 -18187  360 -18190 0

c  -2-1 --> break 
c    ( b^{72, 5}_2 ∧  b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨  b^{72, 5}_0 ∨  p_360 ∨ break
c  in DIMACS:
-18185 -18186  18187  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 5}_2 ∧ -b^{72, 5}_1 ∧ -b^{72, 5}_0 ∧ true) 
c  in CNF:
c    -b^{72, 5}_2 ∨  b^{72, 5}_1 ∨  b^{72, 5}_0 ∨ false 
c  in DIMACS:
-18185  18186  18187  0

c  3 does not represent an automaton state.
c    -(-b^{72, 5}_2 ∧  b^{72, 5}_1 ∧  b^{72, 5}_0 ∧ true) 
c  in CNF:
c     b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ false 
c  in DIMACS:
 18185 -18186 -18187  0
c  -3 does not represent an automaton state.
c    -( b^{72, 5}_2 ∧  b^{72, 5}_1 ∧  b^{72, 5}_0 ∧ true) 
c  in CNF:
c    -b^{72, 5}_2 ∨ -b^{72, 5}_1 ∨ -b^{72, 5}_0 ∨ false 
c  in DIMACS:
-18185 -18186 -18187  0

c i = 6
c  -2+1 --> -1
c    ( b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧  p_432) -> ( b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0)
c  in CNF:
c    -b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨  b^{72, 7}_2
c    -b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_1
c    -b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨  b^{72, 7}_0
c  in DIMACS:
-18188 -18189  18190 -432  18191 0
-18188 -18189  18190 -432 -18192 0
-18188 -18189  18190 -432  18193 0

c  -1+1 --> 0
c    ( b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0 ∧  p_432) -> (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧ -b^{72, 7}_0)
c  in CNF:
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_2
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_1
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_0
c  in DIMACS:
-18188  18189 -18190 -432 -18191 0
-18188  18189 -18190 -432 -18192 0
-18188  18189 -18190 -432 -18193 0

c  0+1 --> 1
c    (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧  p_432) -> (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0)
c  in CNF:
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_2
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_1
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨  b^{72, 7}_0
c  in DIMACS:
 18188  18189  18190 -432 -18191 0
 18188  18189  18190 -432 -18192 0
 18188  18189  18190 -432  18193 0

c  1+1 --> 2
c    (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0 ∧  p_432) -> (-b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0)
c  in CNF:
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_2
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨  b^{72, 7}_1
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ -p_432 ∨ -b^{72, 7}_0
c  in DIMACS:
 18188  18189 -18190 -432 -18191 0
 18188  18189 -18190 -432  18192 0
 18188  18189 -18190 -432 -18193 0

c  2+1 --> break 
c    (-b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧  p_432) -> break
c  in CNF:
c     b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 18188 -18189  18190 -432 1162 0


c  2-1 --> 1
c    (-b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧ -p_432) -> (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0)
c  in CNF:
c     b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_2
c     b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_1
c     b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨  b^{72, 7}_0
c  in DIMACS:
 18188 -18189  18190  432 -18191 0
 18188 -18189  18190  432 -18192 0
 18188 -18189  18190  432  18193 0

c  1-1 --> 0
c    (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0 ∧ -p_432) -> (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧ -b^{72, 7}_0)
c  in CNF:
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_2
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_1
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_0
c  in DIMACS:
 18188  18189 -18190  432 -18191 0
 18188  18189 -18190  432 -18192 0
 18188  18189 -18190  432 -18193 0

c  0-1 --> -1
c    (-b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧ -p_432) -> ( b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0)
c  in CNF:
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨  b^{72, 7}_2
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_1
c     b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨  b^{72, 7}_0
c  in DIMACS:
 18188  18189  18190  432  18191 0
 18188  18189  18190  432 -18192 0
 18188  18189  18190  432  18193 0

c  -1-1 --> -2
c    ( b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧  b^{72, 6}_0 ∧ -p_432) -> ( b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0)
c  in CNF:
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨  b^{72, 7}_2
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨  b^{72, 7}_1
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨  p_432 ∨ -b^{72, 7}_0
c  in DIMACS:
-18188  18189 -18190  432  18191 0
-18188  18189 -18190  432  18192 0
-18188  18189 -18190  432 -18193 0

c  -2-1 --> break 
c    ( b^{72, 6}_2 ∧  b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨  b^{72, 6}_0 ∨  p_432 ∨ break
c  in DIMACS:
-18188 -18189  18190  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 6}_2 ∧ -b^{72, 6}_1 ∧ -b^{72, 6}_0 ∧ true) 
c  in CNF:
c    -b^{72, 6}_2 ∨  b^{72, 6}_1 ∨  b^{72, 6}_0 ∨ false 
c  in DIMACS:
-18188  18189  18190  0

c  3 does not represent an automaton state.
c    -(-b^{72, 6}_2 ∧  b^{72, 6}_1 ∧  b^{72, 6}_0 ∧ true) 
c  in CNF:
c     b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ false 
c  in DIMACS:
 18188 -18189 -18190  0
c  -3 does not represent an automaton state.
c    -( b^{72, 6}_2 ∧  b^{72, 6}_1 ∧  b^{72, 6}_0 ∧ true) 
c  in CNF:
c    -b^{72, 6}_2 ∨ -b^{72, 6}_1 ∨ -b^{72, 6}_0 ∨ false 
c  in DIMACS:
-18188 -18189 -18190  0

c i = 7
c  -2+1 --> -1
c    ( b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧  p_504) -> ( b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0)
c  in CNF:
c    -b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨  b^{72, 8}_2
c    -b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_1
c    -b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨  b^{72, 8}_0
c  in DIMACS:
-18191 -18192  18193 -504  18194 0
-18191 -18192  18193 -504 -18195 0
-18191 -18192  18193 -504  18196 0

c  -1+1 --> 0
c    ( b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0 ∧  p_504) -> (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧ -b^{72, 8}_0)
c  in CNF:
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_2
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_1
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_0
c  in DIMACS:
-18191  18192 -18193 -504 -18194 0
-18191  18192 -18193 -504 -18195 0
-18191  18192 -18193 -504 -18196 0

c  0+1 --> 1
c    (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧  p_504) -> (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0)
c  in CNF:
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_2
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_1
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨  b^{72, 8}_0
c  in DIMACS:
 18191  18192  18193 -504 -18194 0
 18191  18192  18193 -504 -18195 0
 18191  18192  18193 -504  18196 0

c  1+1 --> 2
c    (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0 ∧  p_504) -> (-b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0)
c  in CNF:
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_2
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨  b^{72, 8}_1
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ -p_504 ∨ -b^{72, 8}_0
c  in DIMACS:
 18191  18192 -18193 -504 -18194 0
 18191  18192 -18193 -504  18195 0
 18191  18192 -18193 -504 -18196 0

c  2+1 --> break 
c    (-b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧  p_504) -> break
c  in CNF:
c     b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 18191 -18192  18193 -504 1162 0


c  2-1 --> 1
c    (-b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧ -p_504) -> (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0)
c  in CNF:
c     b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_2
c     b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_1
c     b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨  b^{72, 8}_0
c  in DIMACS:
 18191 -18192  18193  504 -18194 0
 18191 -18192  18193  504 -18195 0
 18191 -18192  18193  504  18196 0

c  1-1 --> 0
c    (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0 ∧ -p_504) -> (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧ -b^{72, 8}_0)
c  in CNF:
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_2
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_1
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_0
c  in DIMACS:
 18191  18192 -18193  504 -18194 0
 18191  18192 -18193  504 -18195 0
 18191  18192 -18193  504 -18196 0

c  0-1 --> -1
c    (-b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧ -p_504) -> ( b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0)
c  in CNF:
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨  b^{72, 8}_2
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_1
c     b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨  b^{72, 8}_0
c  in DIMACS:
 18191  18192  18193  504  18194 0
 18191  18192  18193  504 -18195 0
 18191  18192  18193  504  18196 0

c  -1-1 --> -2
c    ( b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧  b^{72, 7}_0 ∧ -p_504) -> ( b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0)
c  in CNF:
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨  b^{72, 8}_2
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨  b^{72, 8}_1
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨  p_504 ∨ -b^{72, 8}_0
c  in DIMACS:
-18191  18192 -18193  504  18194 0
-18191  18192 -18193  504  18195 0
-18191  18192 -18193  504 -18196 0

c  -2-1 --> break 
c    ( b^{72, 7}_2 ∧  b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨  b^{72, 7}_0 ∨  p_504 ∨ break
c  in DIMACS:
-18191 -18192  18193  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 7}_2 ∧ -b^{72, 7}_1 ∧ -b^{72, 7}_0 ∧ true) 
c  in CNF:
c    -b^{72, 7}_2 ∨  b^{72, 7}_1 ∨  b^{72, 7}_0 ∨ false 
c  in DIMACS:
-18191  18192  18193  0

c  3 does not represent an automaton state.
c    -(-b^{72, 7}_2 ∧  b^{72, 7}_1 ∧  b^{72, 7}_0 ∧ true) 
c  in CNF:
c     b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ false 
c  in DIMACS:
 18191 -18192 -18193  0
c  -3 does not represent an automaton state.
c    -( b^{72, 7}_2 ∧  b^{72, 7}_1 ∧  b^{72, 7}_0 ∧ true) 
c  in CNF:
c    -b^{72, 7}_2 ∨ -b^{72, 7}_1 ∨ -b^{72, 7}_0 ∨ false 
c  in DIMACS:
-18191 -18192 -18193  0

c i = 8
c  -2+1 --> -1
c    ( b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧  p_576) -> ( b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0)
c  in CNF:
c    -b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨  b^{72, 9}_2
c    -b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_1
c    -b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨  b^{72, 9}_0
c  in DIMACS:
-18194 -18195  18196 -576  18197 0
-18194 -18195  18196 -576 -18198 0
-18194 -18195  18196 -576  18199 0

c  -1+1 --> 0
c    ( b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0 ∧  p_576) -> (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧ -b^{72, 9}_0)
c  in CNF:
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_2
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_1
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_0
c  in DIMACS:
-18194  18195 -18196 -576 -18197 0
-18194  18195 -18196 -576 -18198 0
-18194  18195 -18196 -576 -18199 0

c  0+1 --> 1
c    (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧  p_576) -> (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0)
c  in CNF:
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_2
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_1
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨  b^{72, 9}_0
c  in DIMACS:
 18194  18195  18196 -576 -18197 0
 18194  18195  18196 -576 -18198 0
 18194  18195  18196 -576  18199 0

c  1+1 --> 2
c    (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0 ∧  p_576) -> (-b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0)
c  in CNF:
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_2
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨  b^{72, 9}_1
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ -p_576 ∨ -b^{72, 9}_0
c  in DIMACS:
 18194  18195 -18196 -576 -18197 0
 18194  18195 -18196 -576  18198 0
 18194  18195 -18196 -576 -18199 0

c  2+1 --> break 
c    (-b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧  p_576) -> break
c  in CNF:
c     b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 18194 -18195  18196 -576 1162 0


c  2-1 --> 1
c    (-b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧ -p_576) -> (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0)
c  in CNF:
c     b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_2
c     b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_1
c     b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨  b^{72, 9}_0
c  in DIMACS:
 18194 -18195  18196  576 -18197 0
 18194 -18195  18196  576 -18198 0
 18194 -18195  18196  576  18199 0

c  1-1 --> 0
c    (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0 ∧ -p_576) -> (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧ -b^{72, 9}_0)
c  in CNF:
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_2
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_1
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_0
c  in DIMACS:
 18194  18195 -18196  576 -18197 0
 18194  18195 -18196  576 -18198 0
 18194  18195 -18196  576 -18199 0

c  0-1 --> -1
c    (-b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧ -p_576) -> ( b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0)
c  in CNF:
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨  b^{72, 9}_2
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_1
c     b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨  b^{72, 9}_0
c  in DIMACS:
 18194  18195  18196  576  18197 0
 18194  18195  18196  576 -18198 0
 18194  18195  18196  576  18199 0

c  -1-1 --> -2
c    ( b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧  b^{72, 8}_0 ∧ -p_576) -> ( b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0)
c  in CNF:
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨  b^{72, 9}_2
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨  b^{72, 9}_1
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨  p_576 ∨ -b^{72, 9}_0
c  in DIMACS:
-18194  18195 -18196  576  18197 0
-18194  18195 -18196  576  18198 0
-18194  18195 -18196  576 -18199 0

c  -2-1 --> break 
c    ( b^{72, 8}_2 ∧  b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨  b^{72, 8}_0 ∨  p_576 ∨ break
c  in DIMACS:
-18194 -18195  18196  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 8}_2 ∧ -b^{72, 8}_1 ∧ -b^{72, 8}_0 ∧ true) 
c  in CNF:
c    -b^{72, 8}_2 ∨  b^{72, 8}_1 ∨  b^{72, 8}_0 ∨ false 
c  in DIMACS:
-18194  18195  18196  0

c  3 does not represent an automaton state.
c    -(-b^{72, 8}_2 ∧  b^{72, 8}_1 ∧  b^{72, 8}_0 ∧ true) 
c  in CNF:
c     b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ false 
c  in DIMACS:
 18194 -18195 -18196  0
c  -3 does not represent an automaton state.
c    -( b^{72, 8}_2 ∧  b^{72, 8}_1 ∧  b^{72, 8}_0 ∧ true) 
c  in CNF:
c    -b^{72, 8}_2 ∨ -b^{72, 8}_1 ∨ -b^{72, 8}_0 ∨ false 
c  in DIMACS:
-18194 -18195 -18196  0

c i = 9
c  -2+1 --> -1
c    ( b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧  p_648) -> ( b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0)
c  in CNF:
c    -b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨  b^{72, 10}_2
c    -b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_1
c    -b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨  b^{72, 10}_0
c  in DIMACS:
-18197 -18198  18199 -648  18200 0
-18197 -18198  18199 -648 -18201 0
-18197 -18198  18199 -648  18202 0

c  -1+1 --> 0
c    ( b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0 ∧  p_648) -> (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧ -b^{72, 10}_0)
c  in CNF:
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_2
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_1
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_0
c  in DIMACS:
-18197  18198 -18199 -648 -18200 0
-18197  18198 -18199 -648 -18201 0
-18197  18198 -18199 -648 -18202 0

c  0+1 --> 1
c    (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧  p_648) -> (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0)
c  in CNF:
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_2
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_1
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨  b^{72, 10}_0
c  in DIMACS:
 18197  18198  18199 -648 -18200 0
 18197  18198  18199 -648 -18201 0
 18197  18198  18199 -648  18202 0

c  1+1 --> 2
c    (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0 ∧  p_648) -> (-b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0)
c  in CNF:
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_2
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨  b^{72, 10}_1
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ -p_648 ∨ -b^{72, 10}_0
c  in DIMACS:
 18197  18198 -18199 -648 -18200 0
 18197  18198 -18199 -648  18201 0
 18197  18198 -18199 -648 -18202 0

c  2+1 --> break 
c    (-b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧  p_648) -> break
c  in CNF:
c     b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 18197 -18198  18199 -648 1162 0


c  2-1 --> 1
c    (-b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧ -p_648) -> (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0)
c  in CNF:
c     b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_2
c     b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_1
c     b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨  b^{72, 10}_0
c  in DIMACS:
 18197 -18198  18199  648 -18200 0
 18197 -18198  18199  648 -18201 0
 18197 -18198  18199  648  18202 0

c  1-1 --> 0
c    (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0 ∧ -p_648) -> (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧ -b^{72, 10}_0)
c  in CNF:
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_2
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_1
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_0
c  in DIMACS:
 18197  18198 -18199  648 -18200 0
 18197  18198 -18199  648 -18201 0
 18197  18198 -18199  648 -18202 0

c  0-1 --> -1
c    (-b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧ -p_648) -> ( b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0)
c  in CNF:
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨  b^{72, 10}_2
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_1
c     b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨  b^{72, 10}_0
c  in DIMACS:
 18197  18198  18199  648  18200 0
 18197  18198  18199  648 -18201 0
 18197  18198  18199  648  18202 0

c  -1-1 --> -2
c    ( b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧  b^{72, 9}_0 ∧ -p_648) -> ( b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0)
c  in CNF:
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨  b^{72, 10}_2
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨  b^{72, 10}_1
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨  p_648 ∨ -b^{72, 10}_0
c  in DIMACS:
-18197  18198 -18199  648  18200 0
-18197  18198 -18199  648  18201 0
-18197  18198 -18199  648 -18202 0

c  -2-1 --> break 
c    ( b^{72, 9}_2 ∧  b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨  b^{72, 9}_0 ∨  p_648 ∨ break
c  in DIMACS:
-18197 -18198  18199  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 9}_2 ∧ -b^{72, 9}_1 ∧ -b^{72, 9}_0 ∧ true) 
c  in CNF:
c    -b^{72, 9}_2 ∨  b^{72, 9}_1 ∨  b^{72, 9}_0 ∨ false 
c  in DIMACS:
-18197  18198  18199  0

c  3 does not represent an automaton state.
c    -(-b^{72, 9}_2 ∧  b^{72, 9}_1 ∧  b^{72, 9}_0 ∧ true) 
c  in CNF:
c     b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ false 
c  in DIMACS:
 18197 -18198 -18199  0
c  -3 does not represent an automaton state.
c    -( b^{72, 9}_2 ∧  b^{72, 9}_1 ∧  b^{72, 9}_0 ∧ true) 
c  in CNF:
c    -b^{72, 9}_2 ∨ -b^{72, 9}_1 ∨ -b^{72, 9}_0 ∨ false 
c  in DIMACS:
-18197 -18198 -18199  0

c i = 10
c  -2+1 --> -1
c    ( b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧  p_720) -> ( b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0)
c  in CNF:
c    -b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨  b^{72, 11}_2
c    -b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_1
c    -b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨  b^{72, 11}_0
c  in DIMACS:
-18200 -18201  18202 -720  18203 0
-18200 -18201  18202 -720 -18204 0
-18200 -18201  18202 -720  18205 0

c  -1+1 --> 0
c    ( b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0 ∧  p_720) -> (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧ -b^{72, 11}_0)
c  in CNF:
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_2
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_1
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_0
c  in DIMACS:
-18200  18201 -18202 -720 -18203 0
-18200  18201 -18202 -720 -18204 0
-18200  18201 -18202 -720 -18205 0

c  0+1 --> 1
c    (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧  p_720) -> (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0)
c  in CNF:
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_2
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_1
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨  b^{72, 11}_0
c  in DIMACS:
 18200  18201  18202 -720 -18203 0
 18200  18201  18202 -720 -18204 0
 18200  18201  18202 -720  18205 0

c  1+1 --> 2
c    (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0 ∧  p_720) -> (-b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0)
c  in CNF:
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_2
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨  b^{72, 11}_1
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ -p_720 ∨ -b^{72, 11}_0
c  in DIMACS:
 18200  18201 -18202 -720 -18203 0
 18200  18201 -18202 -720  18204 0
 18200  18201 -18202 -720 -18205 0

c  2+1 --> break 
c    (-b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧  p_720) -> break
c  in CNF:
c     b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 18200 -18201  18202 -720 1162 0


c  2-1 --> 1
c    (-b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧ -p_720) -> (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0)
c  in CNF:
c     b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_2
c     b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_1
c     b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨  b^{72, 11}_0
c  in DIMACS:
 18200 -18201  18202  720 -18203 0
 18200 -18201  18202  720 -18204 0
 18200 -18201  18202  720  18205 0

c  1-1 --> 0
c    (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0 ∧ -p_720) -> (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧ -b^{72, 11}_0)
c  in CNF:
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_2
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_1
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_0
c  in DIMACS:
 18200  18201 -18202  720 -18203 0
 18200  18201 -18202  720 -18204 0
 18200  18201 -18202  720 -18205 0

c  0-1 --> -1
c    (-b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧ -p_720) -> ( b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0)
c  in CNF:
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨  b^{72, 11}_2
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_1
c     b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨  b^{72, 11}_0
c  in DIMACS:
 18200  18201  18202  720  18203 0
 18200  18201  18202  720 -18204 0
 18200  18201  18202  720  18205 0

c  -1-1 --> -2
c    ( b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧  b^{72, 10}_0 ∧ -p_720) -> ( b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0)
c  in CNF:
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨  b^{72, 11}_2
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨  b^{72, 11}_1
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨  p_720 ∨ -b^{72, 11}_0
c  in DIMACS:
-18200  18201 -18202  720  18203 0
-18200  18201 -18202  720  18204 0
-18200  18201 -18202  720 -18205 0

c  -2-1 --> break 
c    ( b^{72, 10}_2 ∧  b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨  b^{72, 10}_0 ∨  p_720 ∨ break
c  in DIMACS:
-18200 -18201  18202  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 10}_2 ∧ -b^{72, 10}_1 ∧ -b^{72, 10}_0 ∧ true) 
c  in CNF:
c    -b^{72, 10}_2 ∨  b^{72, 10}_1 ∨  b^{72, 10}_0 ∨ false 
c  in DIMACS:
-18200  18201  18202  0

c  3 does not represent an automaton state.
c    -(-b^{72, 10}_2 ∧  b^{72, 10}_1 ∧  b^{72, 10}_0 ∧ true) 
c  in CNF:
c     b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ false 
c  in DIMACS:
 18200 -18201 -18202  0
c  -3 does not represent an automaton state.
c    -( b^{72, 10}_2 ∧  b^{72, 10}_1 ∧  b^{72, 10}_0 ∧ true) 
c  in CNF:
c    -b^{72, 10}_2 ∨ -b^{72, 10}_1 ∨ -b^{72, 10}_0 ∨ false 
c  in DIMACS:
-18200 -18201 -18202  0

c i = 11
c  -2+1 --> -1
c    ( b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧  p_792) -> ( b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0)
c  in CNF:
c    -b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨  b^{72, 12}_2
c    -b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_1
c    -b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨  b^{72, 12}_0
c  in DIMACS:
-18203 -18204  18205 -792  18206 0
-18203 -18204  18205 -792 -18207 0
-18203 -18204  18205 -792  18208 0

c  -1+1 --> 0
c    ( b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0 ∧  p_792) -> (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧ -b^{72, 12}_0)
c  in CNF:
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_2
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_1
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_0
c  in DIMACS:
-18203  18204 -18205 -792 -18206 0
-18203  18204 -18205 -792 -18207 0
-18203  18204 -18205 -792 -18208 0

c  0+1 --> 1
c    (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧  p_792) -> (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0)
c  in CNF:
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_2
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_1
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨  b^{72, 12}_0
c  in DIMACS:
 18203  18204  18205 -792 -18206 0
 18203  18204  18205 -792 -18207 0
 18203  18204  18205 -792  18208 0

c  1+1 --> 2
c    (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0 ∧  p_792) -> (-b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0)
c  in CNF:
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_2
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨  b^{72, 12}_1
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ -p_792 ∨ -b^{72, 12}_0
c  in DIMACS:
 18203  18204 -18205 -792 -18206 0
 18203  18204 -18205 -792  18207 0
 18203  18204 -18205 -792 -18208 0

c  2+1 --> break 
c    (-b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧  p_792) -> break
c  in CNF:
c     b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 18203 -18204  18205 -792 1162 0


c  2-1 --> 1
c    (-b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧ -p_792) -> (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0)
c  in CNF:
c     b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_2
c     b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_1
c     b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨  b^{72, 12}_0
c  in DIMACS:
 18203 -18204  18205  792 -18206 0
 18203 -18204  18205  792 -18207 0
 18203 -18204  18205  792  18208 0

c  1-1 --> 0
c    (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0 ∧ -p_792) -> (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧ -b^{72, 12}_0)
c  in CNF:
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_2
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_1
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_0
c  in DIMACS:
 18203  18204 -18205  792 -18206 0
 18203  18204 -18205  792 -18207 0
 18203  18204 -18205  792 -18208 0

c  0-1 --> -1
c    (-b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧ -p_792) -> ( b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0)
c  in CNF:
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨  b^{72, 12}_2
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_1
c     b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨  b^{72, 12}_0
c  in DIMACS:
 18203  18204  18205  792  18206 0
 18203  18204  18205  792 -18207 0
 18203  18204  18205  792  18208 0

c  -1-1 --> -2
c    ( b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧  b^{72, 11}_0 ∧ -p_792) -> ( b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0)
c  in CNF:
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨  b^{72, 12}_2
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨  b^{72, 12}_1
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨  p_792 ∨ -b^{72, 12}_0
c  in DIMACS:
-18203  18204 -18205  792  18206 0
-18203  18204 -18205  792  18207 0
-18203  18204 -18205  792 -18208 0

c  -2-1 --> break 
c    ( b^{72, 11}_2 ∧  b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨  b^{72, 11}_0 ∨  p_792 ∨ break
c  in DIMACS:
-18203 -18204  18205  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 11}_2 ∧ -b^{72, 11}_1 ∧ -b^{72, 11}_0 ∧ true) 
c  in CNF:
c    -b^{72, 11}_2 ∨  b^{72, 11}_1 ∨  b^{72, 11}_0 ∨ false 
c  in DIMACS:
-18203  18204  18205  0

c  3 does not represent an automaton state.
c    -(-b^{72, 11}_2 ∧  b^{72, 11}_1 ∧  b^{72, 11}_0 ∧ true) 
c  in CNF:
c     b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ false 
c  in DIMACS:
 18203 -18204 -18205  0
c  -3 does not represent an automaton state.
c    -( b^{72, 11}_2 ∧  b^{72, 11}_1 ∧  b^{72, 11}_0 ∧ true) 
c  in CNF:
c    -b^{72, 11}_2 ∨ -b^{72, 11}_1 ∨ -b^{72, 11}_0 ∨ false 
c  in DIMACS:
-18203 -18204 -18205  0

c i = 12
c  -2+1 --> -1
c    ( b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧  p_864) -> ( b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0)
c  in CNF:
c    -b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨  b^{72, 13}_2
c    -b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_1
c    -b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨  b^{72, 13}_0
c  in DIMACS:
-18206 -18207  18208 -864  18209 0
-18206 -18207  18208 -864 -18210 0
-18206 -18207  18208 -864  18211 0

c  -1+1 --> 0
c    ( b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0 ∧  p_864) -> (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧ -b^{72, 13}_0)
c  in CNF:
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_2
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_1
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_0
c  in DIMACS:
-18206  18207 -18208 -864 -18209 0
-18206  18207 -18208 -864 -18210 0
-18206  18207 -18208 -864 -18211 0

c  0+1 --> 1
c    (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧  p_864) -> (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0)
c  in CNF:
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_2
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_1
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨  b^{72, 13}_0
c  in DIMACS:
 18206  18207  18208 -864 -18209 0
 18206  18207  18208 -864 -18210 0
 18206  18207  18208 -864  18211 0

c  1+1 --> 2
c    (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0 ∧  p_864) -> (-b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0)
c  in CNF:
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_2
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨  b^{72, 13}_1
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ -p_864 ∨ -b^{72, 13}_0
c  in DIMACS:
 18206  18207 -18208 -864 -18209 0
 18206  18207 -18208 -864  18210 0
 18206  18207 -18208 -864 -18211 0

c  2+1 --> break 
c    (-b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧  p_864) -> break
c  in CNF:
c     b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 18206 -18207  18208 -864 1162 0


c  2-1 --> 1
c    (-b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧ -p_864) -> (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0)
c  in CNF:
c     b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_2
c     b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_1
c     b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨  b^{72, 13}_0
c  in DIMACS:
 18206 -18207  18208  864 -18209 0
 18206 -18207  18208  864 -18210 0
 18206 -18207  18208  864  18211 0

c  1-1 --> 0
c    (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0 ∧ -p_864) -> (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧ -b^{72, 13}_0)
c  in CNF:
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_2
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_1
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_0
c  in DIMACS:
 18206  18207 -18208  864 -18209 0
 18206  18207 -18208  864 -18210 0
 18206  18207 -18208  864 -18211 0

c  0-1 --> -1
c    (-b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧ -p_864) -> ( b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0)
c  in CNF:
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨  b^{72, 13}_2
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_1
c     b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨  b^{72, 13}_0
c  in DIMACS:
 18206  18207  18208  864  18209 0
 18206  18207  18208  864 -18210 0
 18206  18207  18208  864  18211 0

c  -1-1 --> -2
c    ( b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧  b^{72, 12}_0 ∧ -p_864) -> ( b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0)
c  in CNF:
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨  b^{72, 13}_2
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨  b^{72, 13}_1
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨  p_864 ∨ -b^{72, 13}_0
c  in DIMACS:
-18206  18207 -18208  864  18209 0
-18206  18207 -18208  864  18210 0
-18206  18207 -18208  864 -18211 0

c  -2-1 --> break 
c    ( b^{72, 12}_2 ∧  b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨  b^{72, 12}_0 ∨  p_864 ∨ break
c  in DIMACS:
-18206 -18207  18208  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 12}_2 ∧ -b^{72, 12}_1 ∧ -b^{72, 12}_0 ∧ true) 
c  in CNF:
c    -b^{72, 12}_2 ∨  b^{72, 12}_1 ∨  b^{72, 12}_0 ∨ false 
c  in DIMACS:
-18206  18207  18208  0

c  3 does not represent an automaton state.
c    -(-b^{72, 12}_2 ∧  b^{72, 12}_1 ∧  b^{72, 12}_0 ∧ true) 
c  in CNF:
c     b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ false 
c  in DIMACS:
 18206 -18207 -18208  0
c  -3 does not represent an automaton state.
c    -( b^{72, 12}_2 ∧  b^{72, 12}_1 ∧  b^{72, 12}_0 ∧ true) 
c  in CNF:
c    -b^{72, 12}_2 ∨ -b^{72, 12}_1 ∨ -b^{72, 12}_0 ∨ false 
c  in DIMACS:
-18206 -18207 -18208  0

c i = 13
c  -2+1 --> -1
c    ( b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧  p_936) -> ( b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0)
c  in CNF:
c    -b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨  b^{72, 14}_2
c    -b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_1
c    -b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨  b^{72, 14}_0
c  in DIMACS:
-18209 -18210  18211 -936  18212 0
-18209 -18210  18211 -936 -18213 0
-18209 -18210  18211 -936  18214 0

c  -1+1 --> 0
c    ( b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0 ∧  p_936) -> (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧ -b^{72, 14}_0)
c  in CNF:
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_2
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_1
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_0
c  in DIMACS:
-18209  18210 -18211 -936 -18212 0
-18209  18210 -18211 -936 -18213 0
-18209  18210 -18211 -936 -18214 0

c  0+1 --> 1
c    (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧  p_936) -> (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0)
c  in CNF:
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_2
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_1
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨  b^{72, 14}_0
c  in DIMACS:
 18209  18210  18211 -936 -18212 0
 18209  18210  18211 -936 -18213 0
 18209  18210  18211 -936  18214 0

c  1+1 --> 2
c    (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0 ∧  p_936) -> (-b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0)
c  in CNF:
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_2
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨  b^{72, 14}_1
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ -p_936 ∨ -b^{72, 14}_0
c  in DIMACS:
 18209  18210 -18211 -936 -18212 0
 18209  18210 -18211 -936  18213 0
 18209  18210 -18211 -936 -18214 0

c  2+1 --> break 
c    (-b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧  p_936) -> break
c  in CNF:
c     b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 18209 -18210  18211 -936 1162 0


c  2-1 --> 1
c    (-b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧ -p_936) -> (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0)
c  in CNF:
c     b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_2
c     b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_1
c     b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨  b^{72, 14}_0
c  in DIMACS:
 18209 -18210  18211  936 -18212 0
 18209 -18210  18211  936 -18213 0
 18209 -18210  18211  936  18214 0

c  1-1 --> 0
c    (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0 ∧ -p_936) -> (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧ -b^{72, 14}_0)
c  in CNF:
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_2
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_1
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_0
c  in DIMACS:
 18209  18210 -18211  936 -18212 0
 18209  18210 -18211  936 -18213 0
 18209  18210 -18211  936 -18214 0

c  0-1 --> -1
c    (-b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧ -p_936) -> ( b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0)
c  in CNF:
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨  b^{72, 14}_2
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_1
c     b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨  b^{72, 14}_0
c  in DIMACS:
 18209  18210  18211  936  18212 0
 18209  18210  18211  936 -18213 0
 18209  18210  18211  936  18214 0

c  -1-1 --> -2
c    ( b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧  b^{72, 13}_0 ∧ -p_936) -> ( b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0)
c  in CNF:
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨  b^{72, 14}_2
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨  b^{72, 14}_1
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨  p_936 ∨ -b^{72, 14}_0
c  in DIMACS:
-18209  18210 -18211  936  18212 0
-18209  18210 -18211  936  18213 0
-18209  18210 -18211  936 -18214 0

c  -2-1 --> break 
c    ( b^{72, 13}_2 ∧  b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨  b^{72, 13}_0 ∨  p_936 ∨ break
c  in DIMACS:
-18209 -18210  18211  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 13}_2 ∧ -b^{72, 13}_1 ∧ -b^{72, 13}_0 ∧ true) 
c  in CNF:
c    -b^{72, 13}_2 ∨  b^{72, 13}_1 ∨  b^{72, 13}_0 ∨ false 
c  in DIMACS:
-18209  18210  18211  0

c  3 does not represent an automaton state.
c    -(-b^{72, 13}_2 ∧  b^{72, 13}_1 ∧  b^{72, 13}_0 ∧ true) 
c  in CNF:
c     b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ false 
c  in DIMACS:
 18209 -18210 -18211  0
c  -3 does not represent an automaton state.
c    -( b^{72, 13}_2 ∧  b^{72, 13}_1 ∧  b^{72, 13}_0 ∧ true) 
c  in CNF:
c    -b^{72, 13}_2 ∨ -b^{72, 13}_1 ∨ -b^{72, 13}_0 ∨ false 
c  in DIMACS:
-18209 -18210 -18211  0

c i = 14
c  -2+1 --> -1
c    ( b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧  p_1008) -> ( b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0)
c  in CNF:
c    -b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨  b^{72, 15}_2
c    -b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_1
c    -b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨  b^{72, 15}_0
c  in DIMACS:
-18212 -18213  18214 -1008  18215 0
-18212 -18213  18214 -1008 -18216 0
-18212 -18213  18214 -1008  18217 0

c  -1+1 --> 0
c    ( b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0 ∧  p_1008) -> (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧ -b^{72, 15}_0)
c  in CNF:
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_2
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_1
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_0
c  in DIMACS:
-18212  18213 -18214 -1008 -18215 0
-18212  18213 -18214 -1008 -18216 0
-18212  18213 -18214 -1008 -18217 0

c  0+1 --> 1
c    (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧  p_1008) -> (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0)
c  in CNF:
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_2
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_1
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨  b^{72, 15}_0
c  in DIMACS:
 18212  18213  18214 -1008 -18215 0
 18212  18213  18214 -1008 -18216 0
 18212  18213  18214 -1008  18217 0

c  1+1 --> 2
c    (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0 ∧  p_1008) -> (-b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0)
c  in CNF:
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_2
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨  b^{72, 15}_1
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ -p_1008 ∨ -b^{72, 15}_0
c  in DIMACS:
 18212  18213 -18214 -1008 -18215 0
 18212  18213 -18214 -1008  18216 0
 18212  18213 -18214 -1008 -18217 0

c  2+1 --> break 
c    (-b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 18212 -18213  18214 -1008 1162 0


c  2-1 --> 1
c    (-b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧ -p_1008) -> (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0)
c  in CNF:
c     b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_2
c     b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_1
c     b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨  b^{72, 15}_0
c  in DIMACS:
 18212 -18213  18214  1008 -18215 0
 18212 -18213  18214  1008 -18216 0
 18212 -18213  18214  1008  18217 0

c  1-1 --> 0
c    (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0 ∧ -p_1008) -> (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧ -b^{72, 15}_0)
c  in CNF:
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_2
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_1
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_0
c  in DIMACS:
 18212  18213 -18214  1008 -18215 0
 18212  18213 -18214  1008 -18216 0
 18212  18213 -18214  1008 -18217 0

c  0-1 --> -1
c    (-b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧ -p_1008) -> ( b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0)
c  in CNF:
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨  b^{72, 15}_2
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_1
c     b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨  b^{72, 15}_0
c  in DIMACS:
 18212  18213  18214  1008  18215 0
 18212  18213  18214  1008 -18216 0
 18212  18213  18214  1008  18217 0

c  -1-1 --> -2
c    ( b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧  b^{72, 14}_0 ∧ -p_1008) -> ( b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0)
c  in CNF:
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨  b^{72, 15}_2
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨  b^{72, 15}_1
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨  p_1008 ∨ -b^{72, 15}_0
c  in DIMACS:
-18212  18213 -18214  1008  18215 0
-18212  18213 -18214  1008  18216 0
-18212  18213 -18214  1008 -18217 0

c  -2-1 --> break 
c    ( b^{72, 14}_2 ∧  b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨  b^{72, 14}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-18212 -18213  18214  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 14}_2 ∧ -b^{72, 14}_1 ∧ -b^{72, 14}_0 ∧ true) 
c  in CNF:
c    -b^{72, 14}_2 ∨  b^{72, 14}_1 ∨  b^{72, 14}_0 ∨ false 
c  in DIMACS:
-18212  18213  18214  0

c  3 does not represent an automaton state.
c    -(-b^{72, 14}_2 ∧  b^{72, 14}_1 ∧  b^{72, 14}_0 ∧ true) 
c  in CNF:
c     b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ false 
c  in DIMACS:
 18212 -18213 -18214  0
c  -3 does not represent an automaton state.
c    -( b^{72, 14}_2 ∧  b^{72, 14}_1 ∧  b^{72, 14}_0 ∧ true) 
c  in CNF:
c    -b^{72, 14}_2 ∨ -b^{72, 14}_1 ∨ -b^{72, 14}_0 ∨ false 
c  in DIMACS:
-18212 -18213 -18214  0

c i = 15
c  -2+1 --> -1
c    ( b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧  p_1080) -> ( b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0)
c  in CNF:
c    -b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨  b^{72, 16}_2
c    -b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_1
c    -b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨  b^{72, 16}_0
c  in DIMACS:
-18215 -18216  18217 -1080  18218 0
-18215 -18216  18217 -1080 -18219 0
-18215 -18216  18217 -1080  18220 0

c  -1+1 --> 0
c    ( b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0 ∧  p_1080) -> (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧ -b^{72, 16}_0)
c  in CNF:
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_2
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_1
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_0
c  in DIMACS:
-18215  18216 -18217 -1080 -18218 0
-18215  18216 -18217 -1080 -18219 0
-18215  18216 -18217 -1080 -18220 0

c  0+1 --> 1
c    (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧  p_1080) -> (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0)
c  in CNF:
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_2
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_1
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨  b^{72, 16}_0
c  in DIMACS:
 18215  18216  18217 -1080 -18218 0
 18215  18216  18217 -1080 -18219 0
 18215  18216  18217 -1080  18220 0

c  1+1 --> 2
c    (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0 ∧  p_1080) -> (-b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0)
c  in CNF:
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_2
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨  b^{72, 16}_1
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ -p_1080 ∨ -b^{72, 16}_0
c  in DIMACS:
 18215  18216 -18217 -1080 -18218 0
 18215  18216 -18217 -1080  18219 0
 18215  18216 -18217 -1080 -18220 0

c  2+1 --> break 
c    (-b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 18215 -18216  18217 -1080 1162 0


c  2-1 --> 1
c    (-b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧ -p_1080) -> (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0)
c  in CNF:
c     b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_2
c     b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_1
c     b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨  b^{72, 16}_0
c  in DIMACS:
 18215 -18216  18217  1080 -18218 0
 18215 -18216  18217  1080 -18219 0
 18215 -18216  18217  1080  18220 0

c  1-1 --> 0
c    (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0 ∧ -p_1080) -> (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧ -b^{72, 16}_0)
c  in CNF:
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_2
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_1
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_0
c  in DIMACS:
 18215  18216 -18217  1080 -18218 0
 18215  18216 -18217  1080 -18219 0
 18215  18216 -18217  1080 -18220 0

c  0-1 --> -1
c    (-b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧ -p_1080) -> ( b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0)
c  in CNF:
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨  b^{72, 16}_2
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_1
c     b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨  b^{72, 16}_0
c  in DIMACS:
 18215  18216  18217  1080  18218 0
 18215  18216  18217  1080 -18219 0
 18215  18216  18217  1080  18220 0

c  -1-1 --> -2
c    ( b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧  b^{72, 15}_0 ∧ -p_1080) -> ( b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0)
c  in CNF:
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨  b^{72, 16}_2
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨  b^{72, 16}_1
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨  p_1080 ∨ -b^{72, 16}_0
c  in DIMACS:
-18215  18216 -18217  1080  18218 0
-18215  18216 -18217  1080  18219 0
-18215  18216 -18217  1080 -18220 0

c  -2-1 --> break 
c    ( b^{72, 15}_2 ∧  b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨  b^{72, 15}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-18215 -18216  18217  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 15}_2 ∧ -b^{72, 15}_1 ∧ -b^{72, 15}_0 ∧ true) 
c  in CNF:
c    -b^{72, 15}_2 ∨  b^{72, 15}_1 ∨  b^{72, 15}_0 ∨ false 
c  in DIMACS:
-18215  18216  18217  0

c  3 does not represent an automaton state.
c    -(-b^{72, 15}_2 ∧  b^{72, 15}_1 ∧  b^{72, 15}_0 ∧ true) 
c  in CNF:
c     b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ false 
c  in DIMACS:
 18215 -18216 -18217  0
c  -3 does not represent an automaton state.
c    -( b^{72, 15}_2 ∧  b^{72, 15}_1 ∧  b^{72, 15}_0 ∧ true) 
c  in CNF:
c    -b^{72, 15}_2 ∨ -b^{72, 15}_1 ∨ -b^{72, 15}_0 ∨ false 
c  in DIMACS:
-18215 -18216 -18217  0

c i = 16
c  -2+1 --> -1
c    ( b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧  p_1152) -> ( b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧  b^{72, 17}_0)
c  in CNF:
c    -b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨  b^{72, 17}_2
c    -b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_1
c    -b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨  b^{72, 17}_0
c  in DIMACS:
-18218 -18219  18220 -1152  18221 0
-18218 -18219  18220 -1152 -18222 0
-18218 -18219  18220 -1152  18223 0

c  -1+1 --> 0
c    ( b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0 ∧  p_1152) -> (-b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧ -b^{72, 17}_0)
c  in CNF:
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_2
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_1
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_0
c  in DIMACS:
-18218  18219 -18220 -1152 -18221 0
-18218  18219 -18220 -1152 -18222 0
-18218  18219 -18220 -1152 -18223 0

c  0+1 --> 1
c    (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧  p_1152) -> (-b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧  b^{72, 17}_0)
c  in CNF:
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_2
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_1
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨  b^{72, 17}_0
c  in DIMACS:
 18218  18219  18220 -1152 -18221 0
 18218  18219  18220 -1152 -18222 0
 18218  18219  18220 -1152  18223 0

c  1+1 --> 2
c    (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0 ∧  p_1152) -> (-b^{72, 17}_2 ∧  b^{72, 17}_1 ∧ -b^{72, 17}_0)
c  in CNF:
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_2
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨  b^{72, 17}_1
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ -p_1152 ∨ -b^{72, 17}_0
c  in DIMACS:
 18218  18219 -18220 -1152 -18221 0
 18218  18219 -18220 -1152  18222 0
 18218  18219 -18220 -1152 -18223 0

c  2+1 --> break 
c    (-b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 18218 -18219  18220 -1152 1162 0


c  2-1 --> 1
c    (-b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧ -p_1152) -> (-b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧  b^{72, 17}_0)
c  in CNF:
c     b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_2
c     b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_1
c     b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨  b^{72, 17}_0
c  in DIMACS:
 18218 -18219  18220  1152 -18221 0
 18218 -18219  18220  1152 -18222 0
 18218 -18219  18220  1152  18223 0

c  1-1 --> 0
c    (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0 ∧ -p_1152) -> (-b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧ -b^{72, 17}_0)
c  in CNF:
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_2
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_1
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_0
c  in DIMACS:
 18218  18219 -18220  1152 -18221 0
 18218  18219 -18220  1152 -18222 0
 18218  18219 -18220  1152 -18223 0

c  0-1 --> -1
c    (-b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧ -p_1152) -> ( b^{72, 17}_2 ∧ -b^{72, 17}_1 ∧  b^{72, 17}_0)
c  in CNF:
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨  b^{72, 17}_2
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_1
c     b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨  b^{72, 17}_0
c  in DIMACS:
 18218  18219  18220  1152  18221 0
 18218  18219  18220  1152 -18222 0
 18218  18219  18220  1152  18223 0

c  -1-1 --> -2
c    ( b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧  b^{72, 16}_0 ∧ -p_1152) -> ( b^{72, 17}_2 ∧  b^{72, 17}_1 ∧ -b^{72, 17}_0)
c  in CNF:
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨  b^{72, 17}_2
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨  b^{72, 17}_1
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨  p_1152 ∨ -b^{72, 17}_0
c  in DIMACS:
-18218  18219 -18220  1152  18221 0
-18218  18219 -18220  1152  18222 0
-18218  18219 -18220  1152 -18223 0

c  -2-1 --> break 
c    ( b^{72, 16}_2 ∧  b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨  b^{72, 16}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-18218 -18219  18220  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{72, 16}_2 ∧ -b^{72, 16}_1 ∧ -b^{72, 16}_0 ∧ true) 
c  in CNF:
c    -b^{72, 16}_2 ∨  b^{72, 16}_1 ∨  b^{72, 16}_0 ∨ false 
c  in DIMACS:
-18218  18219  18220  0

c  3 does not represent an automaton state.
c    -(-b^{72, 16}_2 ∧  b^{72, 16}_1 ∧  b^{72, 16}_0 ∧ true) 
c  in CNF:
c     b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ false 
c  in DIMACS:
 18218 -18219 -18220  0
c  -3 does not represent an automaton state.
c    -( b^{72, 16}_2 ∧  b^{72, 16}_1 ∧  b^{72, 16}_0 ∧ true) 
c  in CNF:
c    -b^{72, 16}_2 ∨ -b^{72, 16}_1 ∨ -b^{72, 16}_0 ∨ false 
c  in DIMACS:
-18218 -18219 -18220  0

c INIT for k = 73
c    -b^{73, 1}_2
c    -b^{73, 1}_1
c    -b^{73, 1}_0
c  in DIMACS:
-18224 0
-18225 0
-18226 0

c Transitions for k = 73
c i = 1
c  -2+1 --> -1
c    ( b^{73, 1}_2 ∧  b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧  p_73) -> ( b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0)
c  in CNF:
c    -b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨  b^{73, 2}_2
c    -b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_1
c    -b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨  b^{73, 2}_0
c  in DIMACS:
-18224 -18225  18226 -73  18227 0
-18224 -18225  18226 -73 -18228 0
-18224 -18225  18226 -73  18229 0

c  -1+1 --> 0
c    ( b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧  b^{73, 1}_0 ∧  p_73) -> (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧ -b^{73, 2}_0)
c  in CNF:
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_2
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_1
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_0
c  in DIMACS:
-18224  18225 -18226 -73 -18227 0
-18224  18225 -18226 -73 -18228 0
-18224  18225 -18226 -73 -18229 0

c  0+1 --> 1
c    (-b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧  p_73) -> (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0)
c  in CNF:
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_2
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_1
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨  b^{73, 2}_0
c  in DIMACS:
 18224  18225  18226 -73 -18227 0
 18224  18225  18226 -73 -18228 0
 18224  18225  18226 -73  18229 0

c  1+1 --> 2
c    (-b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧  b^{73, 1}_0 ∧  p_73) -> (-b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0)
c  in CNF:
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_2
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨  b^{73, 2}_1
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ -p_73 ∨ -b^{73, 2}_0
c  in DIMACS:
 18224  18225 -18226 -73 -18227 0
 18224  18225 -18226 -73  18228 0
 18224  18225 -18226 -73 -18229 0

c  2+1 --> break 
c    (-b^{73, 1}_2 ∧  b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧  p_73) -> break
c  in CNF:
c     b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ -p_73 ∨ break
c  in DIMACS:
 18224 -18225  18226 -73 1162 0


c  2-1 --> 1
c    (-b^{73, 1}_2 ∧  b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧ -p_73) -> (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0)
c  in CNF:
c     b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_2
c     b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_1
c     b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨  b^{73, 2}_0
c  in DIMACS:
 18224 -18225  18226  73 -18227 0
 18224 -18225  18226  73 -18228 0
 18224 -18225  18226  73  18229 0

c  1-1 --> 0
c    (-b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧  b^{73, 1}_0 ∧ -p_73) -> (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧ -b^{73, 2}_0)
c  in CNF:
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_2
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_1
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_0
c  in DIMACS:
 18224  18225 -18226  73 -18227 0
 18224  18225 -18226  73 -18228 0
 18224  18225 -18226  73 -18229 0

c  0-1 --> -1
c    (-b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧ -p_73) -> ( b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0)
c  in CNF:
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨  b^{73, 2}_2
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_1
c     b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨  b^{73, 2}_0
c  in DIMACS:
 18224  18225  18226  73  18227 0
 18224  18225  18226  73 -18228 0
 18224  18225  18226  73  18229 0

c  -1-1 --> -2
c    ( b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧  b^{73, 1}_0 ∧ -p_73) -> ( b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0)
c  in CNF:
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨  b^{73, 2}_2
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨  b^{73, 2}_1
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨  p_73 ∨ -b^{73, 2}_0
c  in DIMACS:
-18224  18225 -18226  73  18227 0
-18224  18225 -18226  73  18228 0
-18224  18225 -18226  73 -18229 0

c  -2-1 --> break 
c    ( b^{73, 1}_2 ∧  b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧ -p_73) -> break
c  in CNF:
c    -b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨  b^{73, 1}_0 ∨  p_73 ∨ break
c  in DIMACS:
-18224 -18225  18226  73 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 1}_2 ∧ -b^{73, 1}_1 ∧ -b^{73, 1}_0 ∧ true) 
c  in CNF:
c    -b^{73, 1}_2 ∨  b^{73, 1}_1 ∨  b^{73, 1}_0 ∨ false 
c  in DIMACS:
-18224  18225  18226  0

c  3 does not represent an automaton state.
c    -(-b^{73, 1}_2 ∧  b^{73, 1}_1 ∧  b^{73, 1}_0 ∧ true) 
c  in CNF:
c     b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ false 
c  in DIMACS:
 18224 -18225 -18226  0
c  -3 does not represent an automaton state.
c    -( b^{73, 1}_2 ∧  b^{73, 1}_1 ∧  b^{73, 1}_0 ∧ true) 
c  in CNF:
c    -b^{73, 1}_2 ∨ -b^{73, 1}_1 ∨ -b^{73, 1}_0 ∨ false 
c  in DIMACS:
-18224 -18225 -18226  0

c i = 2
c  -2+1 --> -1
c    ( b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧  p_146) -> ( b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0)
c  in CNF:
c    -b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨  b^{73, 3}_2
c    -b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_1
c    -b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨  b^{73, 3}_0
c  in DIMACS:
-18227 -18228  18229 -146  18230 0
-18227 -18228  18229 -146 -18231 0
-18227 -18228  18229 -146  18232 0

c  -1+1 --> 0
c    ( b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0 ∧  p_146) -> (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧ -b^{73, 3}_0)
c  in CNF:
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_2
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_1
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_0
c  in DIMACS:
-18227  18228 -18229 -146 -18230 0
-18227  18228 -18229 -146 -18231 0
-18227  18228 -18229 -146 -18232 0

c  0+1 --> 1
c    (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧  p_146) -> (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0)
c  in CNF:
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_2
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_1
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨  b^{73, 3}_0
c  in DIMACS:
 18227  18228  18229 -146 -18230 0
 18227  18228  18229 -146 -18231 0
 18227  18228  18229 -146  18232 0

c  1+1 --> 2
c    (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0 ∧  p_146) -> (-b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0)
c  in CNF:
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_2
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨  b^{73, 3}_1
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ -p_146 ∨ -b^{73, 3}_0
c  in DIMACS:
 18227  18228 -18229 -146 -18230 0
 18227  18228 -18229 -146  18231 0
 18227  18228 -18229 -146 -18232 0

c  2+1 --> break 
c    (-b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧  p_146) -> break
c  in CNF:
c     b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ -p_146 ∨ break
c  in DIMACS:
 18227 -18228  18229 -146 1162 0


c  2-1 --> 1
c    (-b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧ -p_146) -> (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0)
c  in CNF:
c     b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_2
c     b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_1
c     b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨  b^{73, 3}_0
c  in DIMACS:
 18227 -18228  18229  146 -18230 0
 18227 -18228  18229  146 -18231 0
 18227 -18228  18229  146  18232 0

c  1-1 --> 0
c    (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0 ∧ -p_146) -> (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧ -b^{73, 3}_0)
c  in CNF:
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_2
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_1
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_0
c  in DIMACS:
 18227  18228 -18229  146 -18230 0
 18227  18228 -18229  146 -18231 0
 18227  18228 -18229  146 -18232 0

c  0-1 --> -1
c    (-b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧ -p_146) -> ( b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0)
c  in CNF:
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨  b^{73, 3}_2
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_1
c     b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨  b^{73, 3}_0
c  in DIMACS:
 18227  18228  18229  146  18230 0
 18227  18228  18229  146 -18231 0
 18227  18228  18229  146  18232 0

c  -1-1 --> -2
c    ( b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧  b^{73, 2}_0 ∧ -p_146) -> ( b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0)
c  in CNF:
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨  b^{73, 3}_2
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨  b^{73, 3}_1
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨  p_146 ∨ -b^{73, 3}_0
c  in DIMACS:
-18227  18228 -18229  146  18230 0
-18227  18228 -18229  146  18231 0
-18227  18228 -18229  146 -18232 0

c  -2-1 --> break 
c    ( b^{73, 2}_2 ∧  b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧ -p_146) -> break
c  in CNF:
c    -b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨  b^{73, 2}_0 ∨  p_146 ∨ break
c  in DIMACS:
-18227 -18228  18229  146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 2}_2 ∧ -b^{73, 2}_1 ∧ -b^{73, 2}_0 ∧ true) 
c  in CNF:
c    -b^{73, 2}_2 ∨  b^{73, 2}_1 ∨  b^{73, 2}_0 ∨ false 
c  in DIMACS:
-18227  18228  18229  0

c  3 does not represent an automaton state.
c    -(-b^{73, 2}_2 ∧  b^{73, 2}_1 ∧  b^{73, 2}_0 ∧ true) 
c  in CNF:
c     b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ false 
c  in DIMACS:
 18227 -18228 -18229  0
c  -3 does not represent an automaton state.
c    -( b^{73, 2}_2 ∧  b^{73, 2}_1 ∧  b^{73, 2}_0 ∧ true) 
c  in CNF:
c    -b^{73, 2}_2 ∨ -b^{73, 2}_1 ∨ -b^{73, 2}_0 ∨ false 
c  in DIMACS:
-18227 -18228 -18229  0

c i = 3
c  -2+1 --> -1
c    ( b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧  p_219) -> ( b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0)
c  in CNF:
c    -b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨  b^{73, 4}_2
c    -b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_1
c    -b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨  b^{73, 4}_0
c  in DIMACS:
-18230 -18231  18232 -219  18233 0
-18230 -18231  18232 -219 -18234 0
-18230 -18231  18232 -219  18235 0

c  -1+1 --> 0
c    ( b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0 ∧  p_219) -> (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧ -b^{73, 4}_0)
c  in CNF:
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_2
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_1
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_0
c  in DIMACS:
-18230  18231 -18232 -219 -18233 0
-18230  18231 -18232 -219 -18234 0
-18230  18231 -18232 -219 -18235 0

c  0+1 --> 1
c    (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧  p_219) -> (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0)
c  in CNF:
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_2
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_1
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨  b^{73, 4}_0
c  in DIMACS:
 18230  18231  18232 -219 -18233 0
 18230  18231  18232 -219 -18234 0
 18230  18231  18232 -219  18235 0

c  1+1 --> 2
c    (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0 ∧  p_219) -> (-b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0)
c  in CNF:
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_2
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨  b^{73, 4}_1
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ -p_219 ∨ -b^{73, 4}_0
c  in DIMACS:
 18230  18231 -18232 -219 -18233 0
 18230  18231 -18232 -219  18234 0
 18230  18231 -18232 -219 -18235 0

c  2+1 --> break 
c    (-b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧  p_219) -> break
c  in CNF:
c     b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ -p_219 ∨ break
c  in DIMACS:
 18230 -18231  18232 -219 1162 0


c  2-1 --> 1
c    (-b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧ -p_219) -> (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0)
c  in CNF:
c     b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_2
c     b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_1
c     b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨  b^{73, 4}_0
c  in DIMACS:
 18230 -18231  18232  219 -18233 0
 18230 -18231  18232  219 -18234 0
 18230 -18231  18232  219  18235 0

c  1-1 --> 0
c    (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0 ∧ -p_219) -> (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧ -b^{73, 4}_0)
c  in CNF:
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_2
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_1
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_0
c  in DIMACS:
 18230  18231 -18232  219 -18233 0
 18230  18231 -18232  219 -18234 0
 18230  18231 -18232  219 -18235 0

c  0-1 --> -1
c    (-b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧ -p_219) -> ( b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0)
c  in CNF:
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨  b^{73, 4}_2
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_1
c     b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨  b^{73, 4}_0
c  in DIMACS:
 18230  18231  18232  219  18233 0
 18230  18231  18232  219 -18234 0
 18230  18231  18232  219  18235 0

c  -1-1 --> -2
c    ( b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧  b^{73, 3}_0 ∧ -p_219) -> ( b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0)
c  in CNF:
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨  b^{73, 4}_2
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨  b^{73, 4}_1
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨  p_219 ∨ -b^{73, 4}_0
c  in DIMACS:
-18230  18231 -18232  219  18233 0
-18230  18231 -18232  219  18234 0
-18230  18231 -18232  219 -18235 0

c  -2-1 --> break 
c    ( b^{73, 3}_2 ∧  b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧ -p_219) -> break
c  in CNF:
c    -b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨  b^{73, 3}_0 ∨  p_219 ∨ break
c  in DIMACS:
-18230 -18231  18232  219 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 3}_2 ∧ -b^{73, 3}_1 ∧ -b^{73, 3}_0 ∧ true) 
c  in CNF:
c    -b^{73, 3}_2 ∨  b^{73, 3}_1 ∨  b^{73, 3}_0 ∨ false 
c  in DIMACS:
-18230  18231  18232  0

c  3 does not represent an automaton state.
c    -(-b^{73, 3}_2 ∧  b^{73, 3}_1 ∧  b^{73, 3}_0 ∧ true) 
c  in CNF:
c     b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ false 
c  in DIMACS:
 18230 -18231 -18232  0
c  -3 does not represent an automaton state.
c    -( b^{73, 3}_2 ∧  b^{73, 3}_1 ∧  b^{73, 3}_0 ∧ true) 
c  in CNF:
c    -b^{73, 3}_2 ∨ -b^{73, 3}_1 ∨ -b^{73, 3}_0 ∨ false 
c  in DIMACS:
-18230 -18231 -18232  0

c i = 4
c  -2+1 --> -1
c    ( b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧  p_292) -> ( b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0)
c  in CNF:
c    -b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨  b^{73, 5}_2
c    -b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_1
c    -b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨  b^{73, 5}_0
c  in DIMACS:
-18233 -18234  18235 -292  18236 0
-18233 -18234  18235 -292 -18237 0
-18233 -18234  18235 -292  18238 0

c  -1+1 --> 0
c    ( b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0 ∧  p_292) -> (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧ -b^{73, 5}_0)
c  in CNF:
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_2
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_1
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_0
c  in DIMACS:
-18233  18234 -18235 -292 -18236 0
-18233  18234 -18235 -292 -18237 0
-18233  18234 -18235 -292 -18238 0

c  0+1 --> 1
c    (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧  p_292) -> (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0)
c  in CNF:
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_2
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_1
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨  b^{73, 5}_0
c  in DIMACS:
 18233  18234  18235 -292 -18236 0
 18233  18234  18235 -292 -18237 0
 18233  18234  18235 -292  18238 0

c  1+1 --> 2
c    (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0 ∧  p_292) -> (-b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0)
c  in CNF:
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_2
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨  b^{73, 5}_1
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ -p_292 ∨ -b^{73, 5}_0
c  in DIMACS:
 18233  18234 -18235 -292 -18236 0
 18233  18234 -18235 -292  18237 0
 18233  18234 -18235 -292 -18238 0

c  2+1 --> break 
c    (-b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧  p_292) -> break
c  in CNF:
c     b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 18233 -18234  18235 -292 1162 0


c  2-1 --> 1
c    (-b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧ -p_292) -> (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0)
c  in CNF:
c     b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_2
c     b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_1
c     b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨  b^{73, 5}_0
c  in DIMACS:
 18233 -18234  18235  292 -18236 0
 18233 -18234  18235  292 -18237 0
 18233 -18234  18235  292  18238 0

c  1-1 --> 0
c    (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0 ∧ -p_292) -> (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧ -b^{73, 5}_0)
c  in CNF:
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_2
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_1
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_0
c  in DIMACS:
 18233  18234 -18235  292 -18236 0
 18233  18234 -18235  292 -18237 0
 18233  18234 -18235  292 -18238 0

c  0-1 --> -1
c    (-b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧ -p_292) -> ( b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0)
c  in CNF:
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨  b^{73, 5}_2
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_1
c     b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨  b^{73, 5}_0
c  in DIMACS:
 18233  18234  18235  292  18236 0
 18233  18234  18235  292 -18237 0
 18233  18234  18235  292  18238 0

c  -1-1 --> -2
c    ( b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧  b^{73, 4}_0 ∧ -p_292) -> ( b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0)
c  in CNF:
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨  b^{73, 5}_2
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨  b^{73, 5}_1
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨  p_292 ∨ -b^{73, 5}_0
c  in DIMACS:
-18233  18234 -18235  292  18236 0
-18233  18234 -18235  292  18237 0
-18233  18234 -18235  292 -18238 0

c  -2-1 --> break 
c    ( b^{73, 4}_2 ∧  b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨  b^{73, 4}_0 ∨  p_292 ∨ break
c  in DIMACS:
-18233 -18234  18235  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 4}_2 ∧ -b^{73, 4}_1 ∧ -b^{73, 4}_0 ∧ true) 
c  in CNF:
c    -b^{73, 4}_2 ∨  b^{73, 4}_1 ∨  b^{73, 4}_0 ∨ false 
c  in DIMACS:
-18233  18234  18235  0

c  3 does not represent an automaton state.
c    -(-b^{73, 4}_2 ∧  b^{73, 4}_1 ∧  b^{73, 4}_0 ∧ true) 
c  in CNF:
c     b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ false 
c  in DIMACS:
 18233 -18234 -18235  0
c  -3 does not represent an automaton state.
c    -( b^{73, 4}_2 ∧  b^{73, 4}_1 ∧  b^{73, 4}_0 ∧ true) 
c  in CNF:
c    -b^{73, 4}_2 ∨ -b^{73, 4}_1 ∨ -b^{73, 4}_0 ∨ false 
c  in DIMACS:
-18233 -18234 -18235  0

c i = 5
c  -2+1 --> -1
c    ( b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧  p_365) -> ( b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0)
c  in CNF:
c    -b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨  b^{73, 6}_2
c    -b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_1
c    -b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨  b^{73, 6}_0
c  in DIMACS:
-18236 -18237  18238 -365  18239 0
-18236 -18237  18238 -365 -18240 0
-18236 -18237  18238 -365  18241 0

c  -1+1 --> 0
c    ( b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0 ∧  p_365) -> (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧ -b^{73, 6}_0)
c  in CNF:
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_2
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_1
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_0
c  in DIMACS:
-18236  18237 -18238 -365 -18239 0
-18236  18237 -18238 -365 -18240 0
-18236  18237 -18238 -365 -18241 0

c  0+1 --> 1
c    (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧  p_365) -> (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0)
c  in CNF:
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_2
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_1
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨  b^{73, 6}_0
c  in DIMACS:
 18236  18237  18238 -365 -18239 0
 18236  18237  18238 -365 -18240 0
 18236  18237  18238 -365  18241 0

c  1+1 --> 2
c    (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0 ∧  p_365) -> (-b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0)
c  in CNF:
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_2
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨  b^{73, 6}_1
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ -p_365 ∨ -b^{73, 6}_0
c  in DIMACS:
 18236  18237 -18238 -365 -18239 0
 18236  18237 -18238 -365  18240 0
 18236  18237 -18238 -365 -18241 0

c  2+1 --> break 
c    (-b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧  p_365) -> break
c  in CNF:
c     b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ -p_365 ∨ break
c  in DIMACS:
 18236 -18237  18238 -365 1162 0


c  2-1 --> 1
c    (-b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧ -p_365) -> (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0)
c  in CNF:
c     b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_2
c     b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_1
c     b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨  b^{73, 6}_0
c  in DIMACS:
 18236 -18237  18238  365 -18239 0
 18236 -18237  18238  365 -18240 0
 18236 -18237  18238  365  18241 0

c  1-1 --> 0
c    (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0 ∧ -p_365) -> (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧ -b^{73, 6}_0)
c  in CNF:
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_2
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_1
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_0
c  in DIMACS:
 18236  18237 -18238  365 -18239 0
 18236  18237 -18238  365 -18240 0
 18236  18237 -18238  365 -18241 0

c  0-1 --> -1
c    (-b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧ -p_365) -> ( b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0)
c  in CNF:
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨  b^{73, 6}_2
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_1
c     b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨  b^{73, 6}_0
c  in DIMACS:
 18236  18237  18238  365  18239 0
 18236  18237  18238  365 -18240 0
 18236  18237  18238  365  18241 0

c  -1-1 --> -2
c    ( b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧  b^{73, 5}_0 ∧ -p_365) -> ( b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0)
c  in CNF:
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨  b^{73, 6}_2
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨  b^{73, 6}_1
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨  p_365 ∨ -b^{73, 6}_0
c  in DIMACS:
-18236  18237 -18238  365  18239 0
-18236  18237 -18238  365  18240 0
-18236  18237 -18238  365 -18241 0

c  -2-1 --> break 
c    ( b^{73, 5}_2 ∧  b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧ -p_365) -> break
c  in CNF:
c    -b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨  b^{73, 5}_0 ∨  p_365 ∨ break
c  in DIMACS:
-18236 -18237  18238  365 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 5}_2 ∧ -b^{73, 5}_1 ∧ -b^{73, 5}_0 ∧ true) 
c  in CNF:
c    -b^{73, 5}_2 ∨  b^{73, 5}_1 ∨  b^{73, 5}_0 ∨ false 
c  in DIMACS:
-18236  18237  18238  0

c  3 does not represent an automaton state.
c    -(-b^{73, 5}_2 ∧  b^{73, 5}_1 ∧  b^{73, 5}_0 ∧ true) 
c  in CNF:
c     b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ false 
c  in DIMACS:
 18236 -18237 -18238  0
c  -3 does not represent an automaton state.
c    -( b^{73, 5}_2 ∧  b^{73, 5}_1 ∧  b^{73, 5}_0 ∧ true) 
c  in CNF:
c    -b^{73, 5}_2 ∨ -b^{73, 5}_1 ∨ -b^{73, 5}_0 ∨ false 
c  in DIMACS:
-18236 -18237 -18238  0

c i = 6
c  -2+1 --> -1
c    ( b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧  p_438) -> ( b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0)
c  in CNF:
c    -b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨  b^{73, 7}_2
c    -b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_1
c    -b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨  b^{73, 7}_0
c  in DIMACS:
-18239 -18240  18241 -438  18242 0
-18239 -18240  18241 -438 -18243 0
-18239 -18240  18241 -438  18244 0

c  -1+1 --> 0
c    ( b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0 ∧  p_438) -> (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧ -b^{73, 7}_0)
c  in CNF:
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_2
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_1
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_0
c  in DIMACS:
-18239  18240 -18241 -438 -18242 0
-18239  18240 -18241 -438 -18243 0
-18239  18240 -18241 -438 -18244 0

c  0+1 --> 1
c    (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧  p_438) -> (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0)
c  in CNF:
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_2
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_1
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨  b^{73, 7}_0
c  in DIMACS:
 18239  18240  18241 -438 -18242 0
 18239  18240  18241 -438 -18243 0
 18239  18240  18241 -438  18244 0

c  1+1 --> 2
c    (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0 ∧  p_438) -> (-b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0)
c  in CNF:
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_2
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨  b^{73, 7}_1
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ -p_438 ∨ -b^{73, 7}_0
c  in DIMACS:
 18239  18240 -18241 -438 -18242 0
 18239  18240 -18241 -438  18243 0
 18239  18240 -18241 -438 -18244 0

c  2+1 --> break 
c    (-b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧  p_438) -> break
c  in CNF:
c     b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 18239 -18240  18241 -438 1162 0


c  2-1 --> 1
c    (-b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧ -p_438) -> (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0)
c  in CNF:
c     b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_2
c     b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_1
c     b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨  b^{73, 7}_0
c  in DIMACS:
 18239 -18240  18241  438 -18242 0
 18239 -18240  18241  438 -18243 0
 18239 -18240  18241  438  18244 0

c  1-1 --> 0
c    (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0 ∧ -p_438) -> (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧ -b^{73, 7}_0)
c  in CNF:
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_2
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_1
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_0
c  in DIMACS:
 18239  18240 -18241  438 -18242 0
 18239  18240 -18241  438 -18243 0
 18239  18240 -18241  438 -18244 0

c  0-1 --> -1
c    (-b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧ -p_438) -> ( b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0)
c  in CNF:
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨  b^{73, 7}_2
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_1
c     b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨  b^{73, 7}_0
c  in DIMACS:
 18239  18240  18241  438  18242 0
 18239  18240  18241  438 -18243 0
 18239  18240  18241  438  18244 0

c  -1-1 --> -2
c    ( b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧  b^{73, 6}_0 ∧ -p_438) -> ( b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0)
c  in CNF:
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨  b^{73, 7}_2
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨  b^{73, 7}_1
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨  p_438 ∨ -b^{73, 7}_0
c  in DIMACS:
-18239  18240 -18241  438  18242 0
-18239  18240 -18241  438  18243 0
-18239  18240 -18241  438 -18244 0

c  -2-1 --> break 
c    ( b^{73, 6}_2 ∧  b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨  b^{73, 6}_0 ∨  p_438 ∨ break
c  in DIMACS:
-18239 -18240  18241  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 6}_2 ∧ -b^{73, 6}_1 ∧ -b^{73, 6}_0 ∧ true) 
c  in CNF:
c    -b^{73, 6}_2 ∨  b^{73, 6}_1 ∨  b^{73, 6}_0 ∨ false 
c  in DIMACS:
-18239  18240  18241  0

c  3 does not represent an automaton state.
c    -(-b^{73, 6}_2 ∧  b^{73, 6}_1 ∧  b^{73, 6}_0 ∧ true) 
c  in CNF:
c     b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ false 
c  in DIMACS:
 18239 -18240 -18241  0
c  -3 does not represent an automaton state.
c    -( b^{73, 6}_2 ∧  b^{73, 6}_1 ∧  b^{73, 6}_0 ∧ true) 
c  in CNF:
c    -b^{73, 6}_2 ∨ -b^{73, 6}_1 ∨ -b^{73, 6}_0 ∨ false 
c  in DIMACS:
-18239 -18240 -18241  0

c i = 7
c  -2+1 --> -1
c    ( b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧  p_511) -> ( b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0)
c  in CNF:
c    -b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨  b^{73, 8}_2
c    -b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_1
c    -b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨  b^{73, 8}_0
c  in DIMACS:
-18242 -18243  18244 -511  18245 0
-18242 -18243  18244 -511 -18246 0
-18242 -18243  18244 -511  18247 0

c  -1+1 --> 0
c    ( b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0 ∧  p_511) -> (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧ -b^{73, 8}_0)
c  in CNF:
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_2
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_1
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_0
c  in DIMACS:
-18242  18243 -18244 -511 -18245 0
-18242  18243 -18244 -511 -18246 0
-18242  18243 -18244 -511 -18247 0

c  0+1 --> 1
c    (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧  p_511) -> (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0)
c  in CNF:
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_2
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_1
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨  b^{73, 8}_0
c  in DIMACS:
 18242  18243  18244 -511 -18245 0
 18242  18243  18244 -511 -18246 0
 18242  18243  18244 -511  18247 0

c  1+1 --> 2
c    (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0 ∧  p_511) -> (-b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0)
c  in CNF:
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_2
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨  b^{73, 8}_1
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ -p_511 ∨ -b^{73, 8}_0
c  in DIMACS:
 18242  18243 -18244 -511 -18245 0
 18242  18243 -18244 -511  18246 0
 18242  18243 -18244 -511 -18247 0

c  2+1 --> break 
c    (-b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧  p_511) -> break
c  in CNF:
c     b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ -p_511 ∨ break
c  in DIMACS:
 18242 -18243  18244 -511 1162 0


c  2-1 --> 1
c    (-b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧ -p_511) -> (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0)
c  in CNF:
c     b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_2
c     b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_1
c     b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨  b^{73, 8}_0
c  in DIMACS:
 18242 -18243  18244  511 -18245 0
 18242 -18243  18244  511 -18246 0
 18242 -18243  18244  511  18247 0

c  1-1 --> 0
c    (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0 ∧ -p_511) -> (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧ -b^{73, 8}_0)
c  in CNF:
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_2
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_1
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_0
c  in DIMACS:
 18242  18243 -18244  511 -18245 0
 18242  18243 -18244  511 -18246 0
 18242  18243 -18244  511 -18247 0

c  0-1 --> -1
c    (-b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧ -p_511) -> ( b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0)
c  in CNF:
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨  b^{73, 8}_2
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_1
c     b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨  b^{73, 8}_0
c  in DIMACS:
 18242  18243  18244  511  18245 0
 18242  18243  18244  511 -18246 0
 18242  18243  18244  511  18247 0

c  -1-1 --> -2
c    ( b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧  b^{73, 7}_0 ∧ -p_511) -> ( b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0)
c  in CNF:
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨  b^{73, 8}_2
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨  b^{73, 8}_1
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨  p_511 ∨ -b^{73, 8}_0
c  in DIMACS:
-18242  18243 -18244  511  18245 0
-18242  18243 -18244  511  18246 0
-18242  18243 -18244  511 -18247 0

c  -2-1 --> break 
c    ( b^{73, 7}_2 ∧  b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧ -p_511) -> break
c  in CNF:
c    -b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨  b^{73, 7}_0 ∨  p_511 ∨ break
c  in DIMACS:
-18242 -18243  18244  511 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 7}_2 ∧ -b^{73, 7}_1 ∧ -b^{73, 7}_0 ∧ true) 
c  in CNF:
c    -b^{73, 7}_2 ∨  b^{73, 7}_1 ∨  b^{73, 7}_0 ∨ false 
c  in DIMACS:
-18242  18243  18244  0

c  3 does not represent an automaton state.
c    -(-b^{73, 7}_2 ∧  b^{73, 7}_1 ∧  b^{73, 7}_0 ∧ true) 
c  in CNF:
c     b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ false 
c  in DIMACS:
 18242 -18243 -18244  0
c  -3 does not represent an automaton state.
c    -( b^{73, 7}_2 ∧  b^{73, 7}_1 ∧  b^{73, 7}_0 ∧ true) 
c  in CNF:
c    -b^{73, 7}_2 ∨ -b^{73, 7}_1 ∨ -b^{73, 7}_0 ∨ false 
c  in DIMACS:
-18242 -18243 -18244  0

c i = 8
c  -2+1 --> -1
c    ( b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧  p_584) -> ( b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0)
c  in CNF:
c    -b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨  b^{73, 9}_2
c    -b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_1
c    -b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨  b^{73, 9}_0
c  in DIMACS:
-18245 -18246  18247 -584  18248 0
-18245 -18246  18247 -584 -18249 0
-18245 -18246  18247 -584  18250 0

c  -1+1 --> 0
c    ( b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0 ∧  p_584) -> (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧ -b^{73, 9}_0)
c  in CNF:
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_2
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_1
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_0
c  in DIMACS:
-18245  18246 -18247 -584 -18248 0
-18245  18246 -18247 -584 -18249 0
-18245  18246 -18247 -584 -18250 0

c  0+1 --> 1
c    (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧  p_584) -> (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0)
c  in CNF:
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_2
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_1
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨  b^{73, 9}_0
c  in DIMACS:
 18245  18246  18247 -584 -18248 0
 18245  18246  18247 -584 -18249 0
 18245  18246  18247 -584  18250 0

c  1+1 --> 2
c    (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0 ∧  p_584) -> (-b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0)
c  in CNF:
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_2
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨  b^{73, 9}_1
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ -p_584 ∨ -b^{73, 9}_0
c  in DIMACS:
 18245  18246 -18247 -584 -18248 0
 18245  18246 -18247 -584  18249 0
 18245  18246 -18247 -584 -18250 0

c  2+1 --> break 
c    (-b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧  p_584) -> break
c  in CNF:
c     b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 18245 -18246  18247 -584 1162 0


c  2-1 --> 1
c    (-b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧ -p_584) -> (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0)
c  in CNF:
c     b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_2
c     b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_1
c     b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨  b^{73, 9}_0
c  in DIMACS:
 18245 -18246  18247  584 -18248 0
 18245 -18246  18247  584 -18249 0
 18245 -18246  18247  584  18250 0

c  1-1 --> 0
c    (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0 ∧ -p_584) -> (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧ -b^{73, 9}_0)
c  in CNF:
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_2
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_1
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_0
c  in DIMACS:
 18245  18246 -18247  584 -18248 0
 18245  18246 -18247  584 -18249 0
 18245  18246 -18247  584 -18250 0

c  0-1 --> -1
c    (-b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧ -p_584) -> ( b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0)
c  in CNF:
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨  b^{73, 9}_2
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_1
c     b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨  b^{73, 9}_0
c  in DIMACS:
 18245  18246  18247  584  18248 0
 18245  18246  18247  584 -18249 0
 18245  18246  18247  584  18250 0

c  -1-1 --> -2
c    ( b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧  b^{73, 8}_0 ∧ -p_584) -> ( b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0)
c  in CNF:
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨  b^{73, 9}_2
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨  b^{73, 9}_1
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨  p_584 ∨ -b^{73, 9}_0
c  in DIMACS:
-18245  18246 -18247  584  18248 0
-18245  18246 -18247  584  18249 0
-18245  18246 -18247  584 -18250 0

c  -2-1 --> break 
c    ( b^{73, 8}_2 ∧  b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨  b^{73, 8}_0 ∨  p_584 ∨ break
c  in DIMACS:
-18245 -18246  18247  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 8}_2 ∧ -b^{73, 8}_1 ∧ -b^{73, 8}_0 ∧ true) 
c  in CNF:
c    -b^{73, 8}_2 ∨  b^{73, 8}_1 ∨  b^{73, 8}_0 ∨ false 
c  in DIMACS:
-18245  18246  18247  0

c  3 does not represent an automaton state.
c    -(-b^{73, 8}_2 ∧  b^{73, 8}_1 ∧  b^{73, 8}_0 ∧ true) 
c  in CNF:
c     b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ false 
c  in DIMACS:
 18245 -18246 -18247  0
c  -3 does not represent an automaton state.
c    -( b^{73, 8}_2 ∧  b^{73, 8}_1 ∧  b^{73, 8}_0 ∧ true) 
c  in CNF:
c    -b^{73, 8}_2 ∨ -b^{73, 8}_1 ∨ -b^{73, 8}_0 ∨ false 
c  in DIMACS:
-18245 -18246 -18247  0

c i = 9
c  -2+1 --> -1
c    ( b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧  p_657) -> ( b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0)
c  in CNF:
c    -b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨  b^{73, 10}_2
c    -b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_1
c    -b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨  b^{73, 10}_0
c  in DIMACS:
-18248 -18249  18250 -657  18251 0
-18248 -18249  18250 -657 -18252 0
-18248 -18249  18250 -657  18253 0

c  -1+1 --> 0
c    ( b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0 ∧  p_657) -> (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧ -b^{73, 10}_0)
c  in CNF:
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_2
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_1
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_0
c  in DIMACS:
-18248  18249 -18250 -657 -18251 0
-18248  18249 -18250 -657 -18252 0
-18248  18249 -18250 -657 -18253 0

c  0+1 --> 1
c    (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧  p_657) -> (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0)
c  in CNF:
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_2
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_1
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨  b^{73, 10}_0
c  in DIMACS:
 18248  18249  18250 -657 -18251 0
 18248  18249  18250 -657 -18252 0
 18248  18249  18250 -657  18253 0

c  1+1 --> 2
c    (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0 ∧  p_657) -> (-b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0)
c  in CNF:
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_2
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨  b^{73, 10}_1
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ -p_657 ∨ -b^{73, 10}_0
c  in DIMACS:
 18248  18249 -18250 -657 -18251 0
 18248  18249 -18250 -657  18252 0
 18248  18249 -18250 -657 -18253 0

c  2+1 --> break 
c    (-b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧  p_657) -> break
c  in CNF:
c     b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ -p_657 ∨ break
c  in DIMACS:
 18248 -18249  18250 -657 1162 0


c  2-1 --> 1
c    (-b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧ -p_657) -> (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0)
c  in CNF:
c     b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_2
c     b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_1
c     b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨  b^{73, 10}_0
c  in DIMACS:
 18248 -18249  18250  657 -18251 0
 18248 -18249  18250  657 -18252 0
 18248 -18249  18250  657  18253 0

c  1-1 --> 0
c    (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0 ∧ -p_657) -> (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧ -b^{73, 10}_0)
c  in CNF:
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_2
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_1
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_0
c  in DIMACS:
 18248  18249 -18250  657 -18251 0
 18248  18249 -18250  657 -18252 0
 18248  18249 -18250  657 -18253 0

c  0-1 --> -1
c    (-b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧ -p_657) -> ( b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0)
c  in CNF:
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨  b^{73, 10}_2
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_1
c     b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨  b^{73, 10}_0
c  in DIMACS:
 18248  18249  18250  657  18251 0
 18248  18249  18250  657 -18252 0
 18248  18249  18250  657  18253 0

c  -1-1 --> -2
c    ( b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧  b^{73, 9}_0 ∧ -p_657) -> ( b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0)
c  in CNF:
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨  b^{73, 10}_2
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨  b^{73, 10}_1
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨  p_657 ∨ -b^{73, 10}_0
c  in DIMACS:
-18248  18249 -18250  657  18251 0
-18248  18249 -18250  657  18252 0
-18248  18249 -18250  657 -18253 0

c  -2-1 --> break 
c    ( b^{73, 9}_2 ∧  b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧ -p_657) -> break
c  in CNF:
c    -b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨  b^{73, 9}_0 ∨  p_657 ∨ break
c  in DIMACS:
-18248 -18249  18250  657 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 9}_2 ∧ -b^{73, 9}_1 ∧ -b^{73, 9}_0 ∧ true) 
c  in CNF:
c    -b^{73, 9}_2 ∨  b^{73, 9}_1 ∨  b^{73, 9}_0 ∨ false 
c  in DIMACS:
-18248  18249  18250  0

c  3 does not represent an automaton state.
c    -(-b^{73, 9}_2 ∧  b^{73, 9}_1 ∧  b^{73, 9}_0 ∧ true) 
c  in CNF:
c     b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ false 
c  in DIMACS:
 18248 -18249 -18250  0
c  -3 does not represent an automaton state.
c    -( b^{73, 9}_2 ∧  b^{73, 9}_1 ∧  b^{73, 9}_0 ∧ true) 
c  in CNF:
c    -b^{73, 9}_2 ∨ -b^{73, 9}_1 ∨ -b^{73, 9}_0 ∨ false 
c  in DIMACS:
-18248 -18249 -18250  0

c i = 10
c  -2+1 --> -1
c    ( b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧  p_730) -> ( b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0)
c  in CNF:
c    -b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨  b^{73, 11}_2
c    -b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_1
c    -b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨  b^{73, 11}_0
c  in DIMACS:
-18251 -18252  18253 -730  18254 0
-18251 -18252  18253 -730 -18255 0
-18251 -18252  18253 -730  18256 0

c  -1+1 --> 0
c    ( b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0 ∧  p_730) -> (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧ -b^{73, 11}_0)
c  in CNF:
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_2
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_1
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_0
c  in DIMACS:
-18251  18252 -18253 -730 -18254 0
-18251  18252 -18253 -730 -18255 0
-18251  18252 -18253 -730 -18256 0

c  0+1 --> 1
c    (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧  p_730) -> (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0)
c  in CNF:
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_2
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_1
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨  b^{73, 11}_0
c  in DIMACS:
 18251  18252  18253 -730 -18254 0
 18251  18252  18253 -730 -18255 0
 18251  18252  18253 -730  18256 0

c  1+1 --> 2
c    (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0 ∧  p_730) -> (-b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0)
c  in CNF:
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_2
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨  b^{73, 11}_1
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ -p_730 ∨ -b^{73, 11}_0
c  in DIMACS:
 18251  18252 -18253 -730 -18254 0
 18251  18252 -18253 -730  18255 0
 18251  18252 -18253 -730 -18256 0

c  2+1 --> break 
c    (-b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧  p_730) -> break
c  in CNF:
c     b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 18251 -18252  18253 -730 1162 0


c  2-1 --> 1
c    (-b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧ -p_730) -> (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0)
c  in CNF:
c     b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_2
c     b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_1
c     b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨  b^{73, 11}_0
c  in DIMACS:
 18251 -18252  18253  730 -18254 0
 18251 -18252  18253  730 -18255 0
 18251 -18252  18253  730  18256 0

c  1-1 --> 0
c    (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0 ∧ -p_730) -> (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧ -b^{73, 11}_0)
c  in CNF:
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_2
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_1
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_0
c  in DIMACS:
 18251  18252 -18253  730 -18254 0
 18251  18252 -18253  730 -18255 0
 18251  18252 -18253  730 -18256 0

c  0-1 --> -1
c    (-b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧ -p_730) -> ( b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0)
c  in CNF:
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨  b^{73, 11}_2
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_1
c     b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨  b^{73, 11}_0
c  in DIMACS:
 18251  18252  18253  730  18254 0
 18251  18252  18253  730 -18255 0
 18251  18252  18253  730  18256 0

c  -1-1 --> -2
c    ( b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧  b^{73, 10}_0 ∧ -p_730) -> ( b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0)
c  in CNF:
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨  b^{73, 11}_2
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨  b^{73, 11}_1
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨  p_730 ∨ -b^{73, 11}_0
c  in DIMACS:
-18251  18252 -18253  730  18254 0
-18251  18252 -18253  730  18255 0
-18251  18252 -18253  730 -18256 0

c  -2-1 --> break 
c    ( b^{73, 10}_2 ∧  b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨  b^{73, 10}_0 ∨  p_730 ∨ break
c  in DIMACS:
-18251 -18252  18253  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 10}_2 ∧ -b^{73, 10}_1 ∧ -b^{73, 10}_0 ∧ true) 
c  in CNF:
c    -b^{73, 10}_2 ∨  b^{73, 10}_1 ∨  b^{73, 10}_0 ∨ false 
c  in DIMACS:
-18251  18252  18253  0

c  3 does not represent an automaton state.
c    -(-b^{73, 10}_2 ∧  b^{73, 10}_1 ∧  b^{73, 10}_0 ∧ true) 
c  in CNF:
c     b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ false 
c  in DIMACS:
 18251 -18252 -18253  0
c  -3 does not represent an automaton state.
c    -( b^{73, 10}_2 ∧  b^{73, 10}_1 ∧  b^{73, 10}_0 ∧ true) 
c  in CNF:
c    -b^{73, 10}_2 ∨ -b^{73, 10}_1 ∨ -b^{73, 10}_0 ∨ false 
c  in DIMACS:
-18251 -18252 -18253  0

c i = 11
c  -2+1 --> -1
c    ( b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧  p_803) -> ( b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0)
c  in CNF:
c    -b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨  b^{73, 12}_2
c    -b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_1
c    -b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨  b^{73, 12}_0
c  in DIMACS:
-18254 -18255  18256 -803  18257 0
-18254 -18255  18256 -803 -18258 0
-18254 -18255  18256 -803  18259 0

c  -1+1 --> 0
c    ( b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0 ∧  p_803) -> (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧ -b^{73, 12}_0)
c  in CNF:
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_2
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_1
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_0
c  in DIMACS:
-18254  18255 -18256 -803 -18257 0
-18254  18255 -18256 -803 -18258 0
-18254  18255 -18256 -803 -18259 0

c  0+1 --> 1
c    (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧  p_803) -> (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0)
c  in CNF:
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_2
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_1
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨  b^{73, 12}_0
c  in DIMACS:
 18254  18255  18256 -803 -18257 0
 18254  18255  18256 -803 -18258 0
 18254  18255  18256 -803  18259 0

c  1+1 --> 2
c    (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0 ∧  p_803) -> (-b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0)
c  in CNF:
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_2
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨  b^{73, 12}_1
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ -p_803 ∨ -b^{73, 12}_0
c  in DIMACS:
 18254  18255 -18256 -803 -18257 0
 18254  18255 -18256 -803  18258 0
 18254  18255 -18256 -803 -18259 0

c  2+1 --> break 
c    (-b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧  p_803) -> break
c  in CNF:
c     b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ -p_803 ∨ break
c  in DIMACS:
 18254 -18255  18256 -803 1162 0


c  2-1 --> 1
c    (-b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧ -p_803) -> (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0)
c  in CNF:
c     b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_2
c     b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_1
c     b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨  b^{73, 12}_0
c  in DIMACS:
 18254 -18255  18256  803 -18257 0
 18254 -18255  18256  803 -18258 0
 18254 -18255  18256  803  18259 0

c  1-1 --> 0
c    (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0 ∧ -p_803) -> (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧ -b^{73, 12}_0)
c  in CNF:
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_2
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_1
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_0
c  in DIMACS:
 18254  18255 -18256  803 -18257 0
 18254  18255 -18256  803 -18258 0
 18254  18255 -18256  803 -18259 0

c  0-1 --> -1
c    (-b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧ -p_803) -> ( b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0)
c  in CNF:
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨  b^{73, 12}_2
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_1
c     b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨  b^{73, 12}_0
c  in DIMACS:
 18254  18255  18256  803  18257 0
 18254  18255  18256  803 -18258 0
 18254  18255  18256  803  18259 0

c  -1-1 --> -2
c    ( b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧  b^{73, 11}_0 ∧ -p_803) -> ( b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0)
c  in CNF:
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨  b^{73, 12}_2
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨  b^{73, 12}_1
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨  p_803 ∨ -b^{73, 12}_0
c  in DIMACS:
-18254  18255 -18256  803  18257 0
-18254  18255 -18256  803  18258 0
-18254  18255 -18256  803 -18259 0

c  -2-1 --> break 
c    ( b^{73, 11}_2 ∧  b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧ -p_803) -> break
c  in CNF:
c    -b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨  b^{73, 11}_0 ∨  p_803 ∨ break
c  in DIMACS:
-18254 -18255  18256  803 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 11}_2 ∧ -b^{73, 11}_1 ∧ -b^{73, 11}_0 ∧ true) 
c  in CNF:
c    -b^{73, 11}_2 ∨  b^{73, 11}_1 ∨  b^{73, 11}_0 ∨ false 
c  in DIMACS:
-18254  18255  18256  0

c  3 does not represent an automaton state.
c    -(-b^{73, 11}_2 ∧  b^{73, 11}_1 ∧  b^{73, 11}_0 ∧ true) 
c  in CNF:
c     b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ false 
c  in DIMACS:
 18254 -18255 -18256  0
c  -3 does not represent an automaton state.
c    -( b^{73, 11}_2 ∧  b^{73, 11}_1 ∧  b^{73, 11}_0 ∧ true) 
c  in CNF:
c    -b^{73, 11}_2 ∨ -b^{73, 11}_1 ∨ -b^{73, 11}_0 ∨ false 
c  in DIMACS:
-18254 -18255 -18256  0

c i = 12
c  -2+1 --> -1
c    ( b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧  p_876) -> ( b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0)
c  in CNF:
c    -b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨  b^{73, 13}_2
c    -b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_1
c    -b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨  b^{73, 13}_0
c  in DIMACS:
-18257 -18258  18259 -876  18260 0
-18257 -18258  18259 -876 -18261 0
-18257 -18258  18259 -876  18262 0

c  -1+1 --> 0
c    ( b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0 ∧  p_876) -> (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧ -b^{73, 13}_0)
c  in CNF:
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_2
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_1
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_0
c  in DIMACS:
-18257  18258 -18259 -876 -18260 0
-18257  18258 -18259 -876 -18261 0
-18257  18258 -18259 -876 -18262 0

c  0+1 --> 1
c    (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧  p_876) -> (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0)
c  in CNF:
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_2
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_1
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨  b^{73, 13}_0
c  in DIMACS:
 18257  18258  18259 -876 -18260 0
 18257  18258  18259 -876 -18261 0
 18257  18258  18259 -876  18262 0

c  1+1 --> 2
c    (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0 ∧  p_876) -> (-b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0)
c  in CNF:
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_2
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨  b^{73, 13}_1
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ -p_876 ∨ -b^{73, 13}_0
c  in DIMACS:
 18257  18258 -18259 -876 -18260 0
 18257  18258 -18259 -876  18261 0
 18257  18258 -18259 -876 -18262 0

c  2+1 --> break 
c    (-b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧  p_876) -> break
c  in CNF:
c     b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 18257 -18258  18259 -876 1162 0


c  2-1 --> 1
c    (-b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧ -p_876) -> (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0)
c  in CNF:
c     b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_2
c     b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_1
c     b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨  b^{73, 13}_0
c  in DIMACS:
 18257 -18258  18259  876 -18260 0
 18257 -18258  18259  876 -18261 0
 18257 -18258  18259  876  18262 0

c  1-1 --> 0
c    (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0 ∧ -p_876) -> (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧ -b^{73, 13}_0)
c  in CNF:
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_2
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_1
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_0
c  in DIMACS:
 18257  18258 -18259  876 -18260 0
 18257  18258 -18259  876 -18261 0
 18257  18258 -18259  876 -18262 0

c  0-1 --> -1
c    (-b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧ -p_876) -> ( b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0)
c  in CNF:
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨  b^{73, 13}_2
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_1
c     b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨  b^{73, 13}_0
c  in DIMACS:
 18257  18258  18259  876  18260 0
 18257  18258  18259  876 -18261 0
 18257  18258  18259  876  18262 0

c  -1-1 --> -2
c    ( b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧  b^{73, 12}_0 ∧ -p_876) -> ( b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0)
c  in CNF:
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨  b^{73, 13}_2
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨  b^{73, 13}_1
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨  p_876 ∨ -b^{73, 13}_0
c  in DIMACS:
-18257  18258 -18259  876  18260 0
-18257  18258 -18259  876  18261 0
-18257  18258 -18259  876 -18262 0

c  -2-1 --> break 
c    ( b^{73, 12}_2 ∧  b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨  b^{73, 12}_0 ∨  p_876 ∨ break
c  in DIMACS:
-18257 -18258  18259  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 12}_2 ∧ -b^{73, 12}_1 ∧ -b^{73, 12}_0 ∧ true) 
c  in CNF:
c    -b^{73, 12}_2 ∨  b^{73, 12}_1 ∨  b^{73, 12}_0 ∨ false 
c  in DIMACS:
-18257  18258  18259  0

c  3 does not represent an automaton state.
c    -(-b^{73, 12}_2 ∧  b^{73, 12}_1 ∧  b^{73, 12}_0 ∧ true) 
c  in CNF:
c     b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ false 
c  in DIMACS:
 18257 -18258 -18259  0
c  -3 does not represent an automaton state.
c    -( b^{73, 12}_2 ∧  b^{73, 12}_1 ∧  b^{73, 12}_0 ∧ true) 
c  in CNF:
c    -b^{73, 12}_2 ∨ -b^{73, 12}_1 ∨ -b^{73, 12}_0 ∨ false 
c  in DIMACS:
-18257 -18258 -18259  0

c i = 13
c  -2+1 --> -1
c    ( b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧  p_949) -> ( b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0)
c  in CNF:
c    -b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨  b^{73, 14}_2
c    -b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_1
c    -b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨  b^{73, 14}_0
c  in DIMACS:
-18260 -18261  18262 -949  18263 0
-18260 -18261  18262 -949 -18264 0
-18260 -18261  18262 -949  18265 0

c  -1+1 --> 0
c    ( b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0 ∧  p_949) -> (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧ -b^{73, 14}_0)
c  in CNF:
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_2
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_1
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_0
c  in DIMACS:
-18260  18261 -18262 -949 -18263 0
-18260  18261 -18262 -949 -18264 0
-18260  18261 -18262 -949 -18265 0

c  0+1 --> 1
c    (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧  p_949) -> (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0)
c  in CNF:
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_2
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_1
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨  b^{73, 14}_0
c  in DIMACS:
 18260  18261  18262 -949 -18263 0
 18260  18261  18262 -949 -18264 0
 18260  18261  18262 -949  18265 0

c  1+1 --> 2
c    (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0 ∧  p_949) -> (-b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0)
c  in CNF:
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_2
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨  b^{73, 14}_1
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ -p_949 ∨ -b^{73, 14}_0
c  in DIMACS:
 18260  18261 -18262 -949 -18263 0
 18260  18261 -18262 -949  18264 0
 18260  18261 -18262 -949 -18265 0

c  2+1 --> break 
c    (-b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧  p_949) -> break
c  in CNF:
c     b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ -p_949 ∨ break
c  in DIMACS:
 18260 -18261  18262 -949 1162 0


c  2-1 --> 1
c    (-b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧ -p_949) -> (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0)
c  in CNF:
c     b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_2
c     b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_1
c     b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨  b^{73, 14}_0
c  in DIMACS:
 18260 -18261  18262  949 -18263 0
 18260 -18261  18262  949 -18264 0
 18260 -18261  18262  949  18265 0

c  1-1 --> 0
c    (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0 ∧ -p_949) -> (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧ -b^{73, 14}_0)
c  in CNF:
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_2
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_1
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_0
c  in DIMACS:
 18260  18261 -18262  949 -18263 0
 18260  18261 -18262  949 -18264 0
 18260  18261 -18262  949 -18265 0

c  0-1 --> -1
c    (-b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧ -p_949) -> ( b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0)
c  in CNF:
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨  b^{73, 14}_2
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_1
c     b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨  b^{73, 14}_0
c  in DIMACS:
 18260  18261  18262  949  18263 0
 18260  18261  18262  949 -18264 0
 18260  18261  18262  949  18265 0

c  -1-1 --> -2
c    ( b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧  b^{73, 13}_0 ∧ -p_949) -> ( b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0)
c  in CNF:
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨  b^{73, 14}_2
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨  b^{73, 14}_1
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨  p_949 ∨ -b^{73, 14}_0
c  in DIMACS:
-18260  18261 -18262  949  18263 0
-18260  18261 -18262  949  18264 0
-18260  18261 -18262  949 -18265 0

c  -2-1 --> break 
c    ( b^{73, 13}_2 ∧  b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧ -p_949) -> break
c  in CNF:
c    -b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨  b^{73, 13}_0 ∨  p_949 ∨ break
c  in DIMACS:
-18260 -18261  18262  949 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 13}_2 ∧ -b^{73, 13}_1 ∧ -b^{73, 13}_0 ∧ true) 
c  in CNF:
c    -b^{73, 13}_2 ∨  b^{73, 13}_1 ∨  b^{73, 13}_0 ∨ false 
c  in DIMACS:
-18260  18261  18262  0

c  3 does not represent an automaton state.
c    -(-b^{73, 13}_2 ∧  b^{73, 13}_1 ∧  b^{73, 13}_0 ∧ true) 
c  in CNF:
c     b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ false 
c  in DIMACS:
 18260 -18261 -18262  0
c  -3 does not represent an automaton state.
c    -( b^{73, 13}_2 ∧  b^{73, 13}_1 ∧  b^{73, 13}_0 ∧ true) 
c  in CNF:
c    -b^{73, 13}_2 ∨ -b^{73, 13}_1 ∨ -b^{73, 13}_0 ∨ false 
c  in DIMACS:
-18260 -18261 -18262  0

c i = 14
c  -2+1 --> -1
c    ( b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧  p_1022) -> ( b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0)
c  in CNF:
c    -b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨  b^{73, 15}_2
c    -b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_1
c    -b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨  b^{73, 15}_0
c  in DIMACS:
-18263 -18264  18265 -1022  18266 0
-18263 -18264  18265 -1022 -18267 0
-18263 -18264  18265 -1022  18268 0

c  -1+1 --> 0
c    ( b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0 ∧  p_1022) -> (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧ -b^{73, 15}_0)
c  in CNF:
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_2
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_1
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_0
c  in DIMACS:
-18263  18264 -18265 -1022 -18266 0
-18263  18264 -18265 -1022 -18267 0
-18263  18264 -18265 -1022 -18268 0

c  0+1 --> 1
c    (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧  p_1022) -> (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0)
c  in CNF:
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_2
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_1
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨  b^{73, 15}_0
c  in DIMACS:
 18263  18264  18265 -1022 -18266 0
 18263  18264  18265 -1022 -18267 0
 18263  18264  18265 -1022  18268 0

c  1+1 --> 2
c    (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0 ∧  p_1022) -> (-b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0)
c  in CNF:
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_2
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨  b^{73, 15}_1
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ -p_1022 ∨ -b^{73, 15}_0
c  in DIMACS:
 18263  18264 -18265 -1022 -18266 0
 18263  18264 -18265 -1022  18267 0
 18263  18264 -18265 -1022 -18268 0

c  2+1 --> break 
c    (-b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 18263 -18264  18265 -1022 1162 0


c  2-1 --> 1
c    (-b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧ -p_1022) -> (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0)
c  in CNF:
c     b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_2
c     b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_1
c     b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨  b^{73, 15}_0
c  in DIMACS:
 18263 -18264  18265  1022 -18266 0
 18263 -18264  18265  1022 -18267 0
 18263 -18264  18265  1022  18268 0

c  1-1 --> 0
c    (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0 ∧ -p_1022) -> (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧ -b^{73, 15}_0)
c  in CNF:
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_2
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_1
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_0
c  in DIMACS:
 18263  18264 -18265  1022 -18266 0
 18263  18264 -18265  1022 -18267 0
 18263  18264 -18265  1022 -18268 0

c  0-1 --> -1
c    (-b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧ -p_1022) -> ( b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0)
c  in CNF:
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨  b^{73, 15}_2
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_1
c     b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨  b^{73, 15}_0
c  in DIMACS:
 18263  18264  18265  1022  18266 0
 18263  18264  18265  1022 -18267 0
 18263  18264  18265  1022  18268 0

c  -1-1 --> -2
c    ( b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧  b^{73, 14}_0 ∧ -p_1022) -> ( b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0)
c  in CNF:
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨  b^{73, 15}_2
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨  b^{73, 15}_1
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨  p_1022 ∨ -b^{73, 15}_0
c  in DIMACS:
-18263  18264 -18265  1022  18266 0
-18263  18264 -18265  1022  18267 0
-18263  18264 -18265  1022 -18268 0

c  -2-1 --> break 
c    ( b^{73, 14}_2 ∧  b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨  b^{73, 14}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-18263 -18264  18265  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 14}_2 ∧ -b^{73, 14}_1 ∧ -b^{73, 14}_0 ∧ true) 
c  in CNF:
c    -b^{73, 14}_2 ∨  b^{73, 14}_1 ∨  b^{73, 14}_0 ∨ false 
c  in DIMACS:
-18263  18264  18265  0

c  3 does not represent an automaton state.
c    -(-b^{73, 14}_2 ∧  b^{73, 14}_1 ∧  b^{73, 14}_0 ∧ true) 
c  in CNF:
c     b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ false 
c  in DIMACS:
 18263 -18264 -18265  0
c  -3 does not represent an automaton state.
c    -( b^{73, 14}_2 ∧  b^{73, 14}_1 ∧  b^{73, 14}_0 ∧ true) 
c  in CNF:
c    -b^{73, 14}_2 ∨ -b^{73, 14}_1 ∨ -b^{73, 14}_0 ∨ false 
c  in DIMACS:
-18263 -18264 -18265  0

c i = 15
c  -2+1 --> -1
c    ( b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧  p_1095) -> ( b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧  b^{73, 16}_0)
c  in CNF:
c    -b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨  b^{73, 16}_2
c    -b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_1
c    -b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨  b^{73, 16}_0
c  in DIMACS:
-18266 -18267  18268 -1095  18269 0
-18266 -18267  18268 -1095 -18270 0
-18266 -18267  18268 -1095  18271 0

c  -1+1 --> 0
c    ( b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0 ∧  p_1095) -> (-b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧ -b^{73, 16}_0)
c  in CNF:
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_2
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_1
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_0
c  in DIMACS:
-18266  18267 -18268 -1095 -18269 0
-18266  18267 -18268 -1095 -18270 0
-18266  18267 -18268 -1095 -18271 0

c  0+1 --> 1
c    (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧  p_1095) -> (-b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧  b^{73, 16}_0)
c  in CNF:
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_2
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_1
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨  b^{73, 16}_0
c  in DIMACS:
 18266  18267  18268 -1095 -18269 0
 18266  18267  18268 -1095 -18270 0
 18266  18267  18268 -1095  18271 0

c  1+1 --> 2
c    (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0 ∧  p_1095) -> (-b^{73, 16}_2 ∧  b^{73, 16}_1 ∧ -b^{73, 16}_0)
c  in CNF:
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_2
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨  b^{73, 16}_1
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ -p_1095 ∨ -b^{73, 16}_0
c  in DIMACS:
 18266  18267 -18268 -1095 -18269 0
 18266  18267 -18268 -1095  18270 0
 18266  18267 -18268 -1095 -18271 0

c  2+1 --> break 
c    (-b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 18266 -18267  18268 -1095 1162 0


c  2-1 --> 1
c    (-b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧ -p_1095) -> (-b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧  b^{73, 16}_0)
c  in CNF:
c     b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_2
c     b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_1
c     b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨  b^{73, 16}_0
c  in DIMACS:
 18266 -18267  18268  1095 -18269 0
 18266 -18267  18268  1095 -18270 0
 18266 -18267  18268  1095  18271 0

c  1-1 --> 0
c    (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0 ∧ -p_1095) -> (-b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧ -b^{73, 16}_0)
c  in CNF:
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_2
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_1
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_0
c  in DIMACS:
 18266  18267 -18268  1095 -18269 0
 18266  18267 -18268  1095 -18270 0
 18266  18267 -18268  1095 -18271 0

c  0-1 --> -1
c    (-b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧ -p_1095) -> ( b^{73, 16}_2 ∧ -b^{73, 16}_1 ∧  b^{73, 16}_0)
c  in CNF:
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨  b^{73, 16}_2
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_1
c     b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨  b^{73, 16}_0
c  in DIMACS:
 18266  18267  18268  1095  18269 0
 18266  18267  18268  1095 -18270 0
 18266  18267  18268  1095  18271 0

c  -1-1 --> -2
c    ( b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧  b^{73, 15}_0 ∧ -p_1095) -> ( b^{73, 16}_2 ∧  b^{73, 16}_1 ∧ -b^{73, 16}_0)
c  in CNF:
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨  b^{73, 16}_2
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨  b^{73, 16}_1
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨  p_1095 ∨ -b^{73, 16}_0
c  in DIMACS:
-18266  18267 -18268  1095  18269 0
-18266  18267 -18268  1095  18270 0
-18266  18267 -18268  1095 -18271 0

c  -2-1 --> break 
c    ( b^{73, 15}_2 ∧  b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨  b^{73, 15}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-18266 -18267  18268  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{73, 15}_2 ∧ -b^{73, 15}_1 ∧ -b^{73, 15}_0 ∧ true) 
c  in CNF:
c    -b^{73, 15}_2 ∨  b^{73, 15}_1 ∨  b^{73, 15}_0 ∨ false 
c  in DIMACS:
-18266  18267  18268  0

c  3 does not represent an automaton state.
c    -(-b^{73, 15}_2 ∧  b^{73, 15}_1 ∧  b^{73, 15}_0 ∧ true) 
c  in CNF:
c     b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ false 
c  in DIMACS:
 18266 -18267 -18268  0
c  -3 does not represent an automaton state.
c    -( b^{73, 15}_2 ∧  b^{73, 15}_1 ∧  b^{73, 15}_0 ∧ true) 
c  in CNF:
c    -b^{73, 15}_2 ∨ -b^{73, 15}_1 ∨ -b^{73, 15}_0 ∨ false 
c  in DIMACS:
-18266 -18267 -18268  0

c INIT for k = 74
c    -b^{74, 1}_2
c    -b^{74, 1}_1
c    -b^{74, 1}_0
c  in DIMACS:
-18272 0
-18273 0
-18274 0

c Transitions for k = 74
c i = 1
c  -2+1 --> -1
c    ( b^{74, 1}_2 ∧  b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧  p_74) -> ( b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0)
c  in CNF:
c    -b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨  b^{74, 2}_2
c    -b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_1
c    -b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨  b^{74, 2}_0
c  in DIMACS:
-18272 -18273  18274 -74  18275 0
-18272 -18273  18274 -74 -18276 0
-18272 -18273  18274 -74  18277 0

c  -1+1 --> 0
c    ( b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧  b^{74, 1}_0 ∧  p_74) -> (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧ -b^{74, 2}_0)
c  in CNF:
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_2
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_1
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_0
c  in DIMACS:
-18272  18273 -18274 -74 -18275 0
-18272  18273 -18274 -74 -18276 0
-18272  18273 -18274 -74 -18277 0

c  0+1 --> 1
c    (-b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧  p_74) -> (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0)
c  in CNF:
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_2
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_1
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨  b^{74, 2}_0
c  in DIMACS:
 18272  18273  18274 -74 -18275 0
 18272  18273  18274 -74 -18276 0
 18272  18273  18274 -74  18277 0

c  1+1 --> 2
c    (-b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧  b^{74, 1}_0 ∧  p_74) -> (-b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0)
c  in CNF:
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_2
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨  b^{74, 2}_1
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ -p_74 ∨ -b^{74, 2}_0
c  in DIMACS:
 18272  18273 -18274 -74 -18275 0
 18272  18273 -18274 -74  18276 0
 18272  18273 -18274 -74 -18277 0

c  2+1 --> break 
c    (-b^{74, 1}_2 ∧  b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧  p_74) -> break
c  in CNF:
c     b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ -p_74 ∨ break
c  in DIMACS:
 18272 -18273  18274 -74 1162 0


c  2-1 --> 1
c    (-b^{74, 1}_2 ∧  b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧ -p_74) -> (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0)
c  in CNF:
c     b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_2
c     b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_1
c     b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨  b^{74, 2}_0
c  in DIMACS:
 18272 -18273  18274  74 -18275 0
 18272 -18273  18274  74 -18276 0
 18272 -18273  18274  74  18277 0

c  1-1 --> 0
c    (-b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧  b^{74, 1}_0 ∧ -p_74) -> (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧ -b^{74, 2}_0)
c  in CNF:
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_2
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_1
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_0
c  in DIMACS:
 18272  18273 -18274  74 -18275 0
 18272  18273 -18274  74 -18276 0
 18272  18273 -18274  74 -18277 0

c  0-1 --> -1
c    (-b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧ -p_74) -> ( b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0)
c  in CNF:
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨  b^{74, 2}_2
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_1
c     b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨  b^{74, 2}_0
c  in DIMACS:
 18272  18273  18274  74  18275 0
 18272  18273  18274  74 -18276 0
 18272  18273  18274  74  18277 0

c  -1-1 --> -2
c    ( b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧  b^{74, 1}_0 ∧ -p_74) -> ( b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0)
c  in CNF:
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨  b^{74, 2}_2
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨  b^{74, 2}_1
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨  p_74 ∨ -b^{74, 2}_0
c  in DIMACS:
-18272  18273 -18274  74  18275 0
-18272  18273 -18274  74  18276 0
-18272  18273 -18274  74 -18277 0

c  -2-1 --> break 
c    ( b^{74, 1}_2 ∧  b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧ -p_74) -> break
c  in CNF:
c    -b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨  b^{74, 1}_0 ∨  p_74 ∨ break
c  in DIMACS:
-18272 -18273  18274  74 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 1}_2 ∧ -b^{74, 1}_1 ∧ -b^{74, 1}_0 ∧ true) 
c  in CNF:
c    -b^{74, 1}_2 ∨  b^{74, 1}_1 ∨  b^{74, 1}_0 ∨ false 
c  in DIMACS:
-18272  18273  18274  0

c  3 does not represent an automaton state.
c    -(-b^{74, 1}_2 ∧  b^{74, 1}_1 ∧  b^{74, 1}_0 ∧ true) 
c  in CNF:
c     b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ false 
c  in DIMACS:
 18272 -18273 -18274  0
c  -3 does not represent an automaton state.
c    -( b^{74, 1}_2 ∧  b^{74, 1}_1 ∧  b^{74, 1}_0 ∧ true) 
c  in CNF:
c    -b^{74, 1}_2 ∨ -b^{74, 1}_1 ∨ -b^{74, 1}_0 ∨ false 
c  in DIMACS:
-18272 -18273 -18274  0

c i = 2
c  -2+1 --> -1
c    ( b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧  p_148) -> ( b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0)
c  in CNF:
c    -b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨  b^{74, 3}_2
c    -b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_1
c    -b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨  b^{74, 3}_0
c  in DIMACS:
-18275 -18276  18277 -148  18278 0
-18275 -18276  18277 -148 -18279 0
-18275 -18276  18277 -148  18280 0

c  -1+1 --> 0
c    ( b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0 ∧  p_148) -> (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧ -b^{74, 3}_0)
c  in CNF:
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_2
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_1
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_0
c  in DIMACS:
-18275  18276 -18277 -148 -18278 0
-18275  18276 -18277 -148 -18279 0
-18275  18276 -18277 -148 -18280 0

c  0+1 --> 1
c    (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧  p_148) -> (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0)
c  in CNF:
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_2
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_1
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨  b^{74, 3}_0
c  in DIMACS:
 18275  18276  18277 -148 -18278 0
 18275  18276  18277 -148 -18279 0
 18275  18276  18277 -148  18280 0

c  1+1 --> 2
c    (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0 ∧  p_148) -> (-b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0)
c  in CNF:
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_2
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨  b^{74, 3}_1
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ -p_148 ∨ -b^{74, 3}_0
c  in DIMACS:
 18275  18276 -18277 -148 -18278 0
 18275  18276 -18277 -148  18279 0
 18275  18276 -18277 -148 -18280 0

c  2+1 --> break 
c    (-b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧  p_148) -> break
c  in CNF:
c     b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 18275 -18276  18277 -148 1162 0


c  2-1 --> 1
c    (-b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧ -p_148) -> (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0)
c  in CNF:
c     b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_2
c     b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_1
c     b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨  b^{74, 3}_0
c  in DIMACS:
 18275 -18276  18277  148 -18278 0
 18275 -18276  18277  148 -18279 0
 18275 -18276  18277  148  18280 0

c  1-1 --> 0
c    (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0 ∧ -p_148) -> (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧ -b^{74, 3}_0)
c  in CNF:
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_2
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_1
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_0
c  in DIMACS:
 18275  18276 -18277  148 -18278 0
 18275  18276 -18277  148 -18279 0
 18275  18276 -18277  148 -18280 0

c  0-1 --> -1
c    (-b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧ -p_148) -> ( b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0)
c  in CNF:
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨  b^{74, 3}_2
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_1
c     b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨  b^{74, 3}_0
c  in DIMACS:
 18275  18276  18277  148  18278 0
 18275  18276  18277  148 -18279 0
 18275  18276  18277  148  18280 0

c  -1-1 --> -2
c    ( b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧  b^{74, 2}_0 ∧ -p_148) -> ( b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0)
c  in CNF:
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨  b^{74, 3}_2
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨  b^{74, 3}_1
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨  p_148 ∨ -b^{74, 3}_0
c  in DIMACS:
-18275  18276 -18277  148  18278 0
-18275  18276 -18277  148  18279 0
-18275  18276 -18277  148 -18280 0

c  -2-1 --> break 
c    ( b^{74, 2}_2 ∧  b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨  b^{74, 2}_0 ∨  p_148 ∨ break
c  in DIMACS:
-18275 -18276  18277  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 2}_2 ∧ -b^{74, 2}_1 ∧ -b^{74, 2}_0 ∧ true) 
c  in CNF:
c    -b^{74, 2}_2 ∨  b^{74, 2}_1 ∨  b^{74, 2}_0 ∨ false 
c  in DIMACS:
-18275  18276  18277  0

c  3 does not represent an automaton state.
c    -(-b^{74, 2}_2 ∧  b^{74, 2}_1 ∧  b^{74, 2}_0 ∧ true) 
c  in CNF:
c     b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ false 
c  in DIMACS:
 18275 -18276 -18277  0
c  -3 does not represent an automaton state.
c    -( b^{74, 2}_2 ∧  b^{74, 2}_1 ∧  b^{74, 2}_0 ∧ true) 
c  in CNF:
c    -b^{74, 2}_2 ∨ -b^{74, 2}_1 ∨ -b^{74, 2}_0 ∨ false 
c  in DIMACS:
-18275 -18276 -18277  0

c i = 3
c  -2+1 --> -1
c    ( b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧  p_222) -> ( b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0)
c  in CNF:
c    -b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨  b^{74, 4}_2
c    -b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_1
c    -b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨  b^{74, 4}_0
c  in DIMACS:
-18278 -18279  18280 -222  18281 0
-18278 -18279  18280 -222 -18282 0
-18278 -18279  18280 -222  18283 0

c  -1+1 --> 0
c    ( b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0 ∧  p_222) -> (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧ -b^{74, 4}_0)
c  in CNF:
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_2
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_1
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_0
c  in DIMACS:
-18278  18279 -18280 -222 -18281 0
-18278  18279 -18280 -222 -18282 0
-18278  18279 -18280 -222 -18283 0

c  0+1 --> 1
c    (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧  p_222) -> (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0)
c  in CNF:
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_2
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_1
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨  b^{74, 4}_0
c  in DIMACS:
 18278  18279  18280 -222 -18281 0
 18278  18279  18280 -222 -18282 0
 18278  18279  18280 -222  18283 0

c  1+1 --> 2
c    (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0 ∧  p_222) -> (-b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0)
c  in CNF:
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_2
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨  b^{74, 4}_1
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ -p_222 ∨ -b^{74, 4}_0
c  in DIMACS:
 18278  18279 -18280 -222 -18281 0
 18278  18279 -18280 -222  18282 0
 18278  18279 -18280 -222 -18283 0

c  2+1 --> break 
c    (-b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧  p_222) -> break
c  in CNF:
c     b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 18278 -18279  18280 -222 1162 0


c  2-1 --> 1
c    (-b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧ -p_222) -> (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0)
c  in CNF:
c     b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_2
c     b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_1
c     b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨  b^{74, 4}_0
c  in DIMACS:
 18278 -18279  18280  222 -18281 0
 18278 -18279  18280  222 -18282 0
 18278 -18279  18280  222  18283 0

c  1-1 --> 0
c    (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0 ∧ -p_222) -> (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧ -b^{74, 4}_0)
c  in CNF:
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_2
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_1
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_0
c  in DIMACS:
 18278  18279 -18280  222 -18281 0
 18278  18279 -18280  222 -18282 0
 18278  18279 -18280  222 -18283 0

c  0-1 --> -1
c    (-b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧ -p_222) -> ( b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0)
c  in CNF:
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨  b^{74, 4}_2
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_1
c     b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨  b^{74, 4}_0
c  in DIMACS:
 18278  18279  18280  222  18281 0
 18278  18279  18280  222 -18282 0
 18278  18279  18280  222  18283 0

c  -1-1 --> -2
c    ( b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧  b^{74, 3}_0 ∧ -p_222) -> ( b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0)
c  in CNF:
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨  b^{74, 4}_2
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨  b^{74, 4}_1
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨  p_222 ∨ -b^{74, 4}_0
c  in DIMACS:
-18278  18279 -18280  222  18281 0
-18278  18279 -18280  222  18282 0
-18278  18279 -18280  222 -18283 0

c  -2-1 --> break 
c    ( b^{74, 3}_2 ∧  b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨  b^{74, 3}_0 ∨  p_222 ∨ break
c  in DIMACS:
-18278 -18279  18280  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 3}_2 ∧ -b^{74, 3}_1 ∧ -b^{74, 3}_0 ∧ true) 
c  in CNF:
c    -b^{74, 3}_2 ∨  b^{74, 3}_1 ∨  b^{74, 3}_0 ∨ false 
c  in DIMACS:
-18278  18279  18280  0

c  3 does not represent an automaton state.
c    -(-b^{74, 3}_2 ∧  b^{74, 3}_1 ∧  b^{74, 3}_0 ∧ true) 
c  in CNF:
c     b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ false 
c  in DIMACS:
 18278 -18279 -18280  0
c  -3 does not represent an automaton state.
c    -( b^{74, 3}_2 ∧  b^{74, 3}_1 ∧  b^{74, 3}_0 ∧ true) 
c  in CNF:
c    -b^{74, 3}_2 ∨ -b^{74, 3}_1 ∨ -b^{74, 3}_0 ∨ false 
c  in DIMACS:
-18278 -18279 -18280  0

c i = 4
c  -2+1 --> -1
c    ( b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧  p_296) -> ( b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0)
c  in CNF:
c    -b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨  b^{74, 5}_2
c    -b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_1
c    -b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨  b^{74, 5}_0
c  in DIMACS:
-18281 -18282  18283 -296  18284 0
-18281 -18282  18283 -296 -18285 0
-18281 -18282  18283 -296  18286 0

c  -1+1 --> 0
c    ( b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0 ∧  p_296) -> (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧ -b^{74, 5}_0)
c  in CNF:
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_2
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_1
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_0
c  in DIMACS:
-18281  18282 -18283 -296 -18284 0
-18281  18282 -18283 -296 -18285 0
-18281  18282 -18283 -296 -18286 0

c  0+1 --> 1
c    (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧  p_296) -> (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0)
c  in CNF:
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_2
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_1
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨  b^{74, 5}_0
c  in DIMACS:
 18281  18282  18283 -296 -18284 0
 18281  18282  18283 -296 -18285 0
 18281  18282  18283 -296  18286 0

c  1+1 --> 2
c    (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0 ∧  p_296) -> (-b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0)
c  in CNF:
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_2
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨  b^{74, 5}_1
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ -p_296 ∨ -b^{74, 5}_0
c  in DIMACS:
 18281  18282 -18283 -296 -18284 0
 18281  18282 -18283 -296  18285 0
 18281  18282 -18283 -296 -18286 0

c  2+1 --> break 
c    (-b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧  p_296) -> break
c  in CNF:
c     b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 18281 -18282  18283 -296 1162 0


c  2-1 --> 1
c    (-b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧ -p_296) -> (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0)
c  in CNF:
c     b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_2
c     b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_1
c     b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨  b^{74, 5}_0
c  in DIMACS:
 18281 -18282  18283  296 -18284 0
 18281 -18282  18283  296 -18285 0
 18281 -18282  18283  296  18286 0

c  1-1 --> 0
c    (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0 ∧ -p_296) -> (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧ -b^{74, 5}_0)
c  in CNF:
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_2
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_1
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_0
c  in DIMACS:
 18281  18282 -18283  296 -18284 0
 18281  18282 -18283  296 -18285 0
 18281  18282 -18283  296 -18286 0

c  0-1 --> -1
c    (-b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧ -p_296) -> ( b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0)
c  in CNF:
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨  b^{74, 5}_2
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_1
c     b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨  b^{74, 5}_0
c  in DIMACS:
 18281  18282  18283  296  18284 0
 18281  18282  18283  296 -18285 0
 18281  18282  18283  296  18286 0

c  -1-1 --> -2
c    ( b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧  b^{74, 4}_0 ∧ -p_296) -> ( b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0)
c  in CNF:
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨  b^{74, 5}_2
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨  b^{74, 5}_1
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨  p_296 ∨ -b^{74, 5}_0
c  in DIMACS:
-18281  18282 -18283  296  18284 0
-18281  18282 -18283  296  18285 0
-18281  18282 -18283  296 -18286 0

c  -2-1 --> break 
c    ( b^{74, 4}_2 ∧  b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨  b^{74, 4}_0 ∨  p_296 ∨ break
c  in DIMACS:
-18281 -18282  18283  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 4}_2 ∧ -b^{74, 4}_1 ∧ -b^{74, 4}_0 ∧ true) 
c  in CNF:
c    -b^{74, 4}_2 ∨  b^{74, 4}_1 ∨  b^{74, 4}_0 ∨ false 
c  in DIMACS:
-18281  18282  18283  0

c  3 does not represent an automaton state.
c    -(-b^{74, 4}_2 ∧  b^{74, 4}_1 ∧  b^{74, 4}_0 ∧ true) 
c  in CNF:
c     b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ false 
c  in DIMACS:
 18281 -18282 -18283  0
c  -3 does not represent an automaton state.
c    -( b^{74, 4}_2 ∧  b^{74, 4}_1 ∧  b^{74, 4}_0 ∧ true) 
c  in CNF:
c    -b^{74, 4}_2 ∨ -b^{74, 4}_1 ∨ -b^{74, 4}_0 ∨ false 
c  in DIMACS:
-18281 -18282 -18283  0

c i = 5
c  -2+1 --> -1
c    ( b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧  p_370) -> ( b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0)
c  in CNF:
c    -b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨  b^{74, 6}_2
c    -b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_1
c    -b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨  b^{74, 6}_0
c  in DIMACS:
-18284 -18285  18286 -370  18287 0
-18284 -18285  18286 -370 -18288 0
-18284 -18285  18286 -370  18289 0

c  -1+1 --> 0
c    ( b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0 ∧  p_370) -> (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧ -b^{74, 6}_0)
c  in CNF:
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_2
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_1
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_0
c  in DIMACS:
-18284  18285 -18286 -370 -18287 0
-18284  18285 -18286 -370 -18288 0
-18284  18285 -18286 -370 -18289 0

c  0+1 --> 1
c    (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧  p_370) -> (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0)
c  in CNF:
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_2
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_1
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨  b^{74, 6}_0
c  in DIMACS:
 18284  18285  18286 -370 -18287 0
 18284  18285  18286 -370 -18288 0
 18284  18285  18286 -370  18289 0

c  1+1 --> 2
c    (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0 ∧  p_370) -> (-b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0)
c  in CNF:
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_2
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨  b^{74, 6}_1
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ -p_370 ∨ -b^{74, 6}_0
c  in DIMACS:
 18284  18285 -18286 -370 -18287 0
 18284  18285 -18286 -370  18288 0
 18284  18285 -18286 -370 -18289 0

c  2+1 --> break 
c    (-b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧  p_370) -> break
c  in CNF:
c     b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 18284 -18285  18286 -370 1162 0


c  2-1 --> 1
c    (-b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧ -p_370) -> (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0)
c  in CNF:
c     b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_2
c     b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_1
c     b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨  b^{74, 6}_0
c  in DIMACS:
 18284 -18285  18286  370 -18287 0
 18284 -18285  18286  370 -18288 0
 18284 -18285  18286  370  18289 0

c  1-1 --> 0
c    (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0 ∧ -p_370) -> (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧ -b^{74, 6}_0)
c  in CNF:
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_2
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_1
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_0
c  in DIMACS:
 18284  18285 -18286  370 -18287 0
 18284  18285 -18286  370 -18288 0
 18284  18285 -18286  370 -18289 0

c  0-1 --> -1
c    (-b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧ -p_370) -> ( b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0)
c  in CNF:
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨  b^{74, 6}_2
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_1
c     b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨  b^{74, 6}_0
c  in DIMACS:
 18284  18285  18286  370  18287 0
 18284  18285  18286  370 -18288 0
 18284  18285  18286  370  18289 0

c  -1-1 --> -2
c    ( b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧  b^{74, 5}_0 ∧ -p_370) -> ( b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0)
c  in CNF:
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨  b^{74, 6}_2
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨  b^{74, 6}_1
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨  p_370 ∨ -b^{74, 6}_0
c  in DIMACS:
-18284  18285 -18286  370  18287 0
-18284  18285 -18286  370  18288 0
-18284  18285 -18286  370 -18289 0

c  -2-1 --> break 
c    ( b^{74, 5}_2 ∧  b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨  b^{74, 5}_0 ∨  p_370 ∨ break
c  in DIMACS:
-18284 -18285  18286  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 5}_2 ∧ -b^{74, 5}_1 ∧ -b^{74, 5}_0 ∧ true) 
c  in CNF:
c    -b^{74, 5}_2 ∨  b^{74, 5}_1 ∨  b^{74, 5}_0 ∨ false 
c  in DIMACS:
-18284  18285  18286  0

c  3 does not represent an automaton state.
c    -(-b^{74, 5}_2 ∧  b^{74, 5}_1 ∧  b^{74, 5}_0 ∧ true) 
c  in CNF:
c     b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ false 
c  in DIMACS:
 18284 -18285 -18286  0
c  -3 does not represent an automaton state.
c    -( b^{74, 5}_2 ∧  b^{74, 5}_1 ∧  b^{74, 5}_0 ∧ true) 
c  in CNF:
c    -b^{74, 5}_2 ∨ -b^{74, 5}_1 ∨ -b^{74, 5}_0 ∨ false 
c  in DIMACS:
-18284 -18285 -18286  0

c i = 6
c  -2+1 --> -1
c    ( b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧  p_444) -> ( b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0)
c  in CNF:
c    -b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨  b^{74, 7}_2
c    -b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_1
c    -b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨  b^{74, 7}_0
c  in DIMACS:
-18287 -18288  18289 -444  18290 0
-18287 -18288  18289 -444 -18291 0
-18287 -18288  18289 -444  18292 0

c  -1+1 --> 0
c    ( b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0 ∧  p_444) -> (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧ -b^{74, 7}_0)
c  in CNF:
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_2
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_1
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_0
c  in DIMACS:
-18287  18288 -18289 -444 -18290 0
-18287  18288 -18289 -444 -18291 0
-18287  18288 -18289 -444 -18292 0

c  0+1 --> 1
c    (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧  p_444) -> (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0)
c  in CNF:
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_2
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_1
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨  b^{74, 7}_0
c  in DIMACS:
 18287  18288  18289 -444 -18290 0
 18287  18288  18289 -444 -18291 0
 18287  18288  18289 -444  18292 0

c  1+1 --> 2
c    (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0 ∧  p_444) -> (-b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0)
c  in CNF:
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_2
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨  b^{74, 7}_1
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ -p_444 ∨ -b^{74, 7}_0
c  in DIMACS:
 18287  18288 -18289 -444 -18290 0
 18287  18288 -18289 -444  18291 0
 18287  18288 -18289 -444 -18292 0

c  2+1 --> break 
c    (-b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧  p_444) -> break
c  in CNF:
c     b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 18287 -18288  18289 -444 1162 0


c  2-1 --> 1
c    (-b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧ -p_444) -> (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0)
c  in CNF:
c     b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_2
c     b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_1
c     b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨  b^{74, 7}_0
c  in DIMACS:
 18287 -18288  18289  444 -18290 0
 18287 -18288  18289  444 -18291 0
 18287 -18288  18289  444  18292 0

c  1-1 --> 0
c    (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0 ∧ -p_444) -> (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧ -b^{74, 7}_0)
c  in CNF:
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_2
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_1
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_0
c  in DIMACS:
 18287  18288 -18289  444 -18290 0
 18287  18288 -18289  444 -18291 0
 18287  18288 -18289  444 -18292 0

c  0-1 --> -1
c    (-b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧ -p_444) -> ( b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0)
c  in CNF:
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨  b^{74, 7}_2
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_1
c     b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨  b^{74, 7}_0
c  in DIMACS:
 18287  18288  18289  444  18290 0
 18287  18288  18289  444 -18291 0
 18287  18288  18289  444  18292 0

c  -1-1 --> -2
c    ( b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧  b^{74, 6}_0 ∧ -p_444) -> ( b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0)
c  in CNF:
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨  b^{74, 7}_2
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨  b^{74, 7}_1
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨  p_444 ∨ -b^{74, 7}_0
c  in DIMACS:
-18287  18288 -18289  444  18290 0
-18287  18288 -18289  444  18291 0
-18287  18288 -18289  444 -18292 0

c  -2-1 --> break 
c    ( b^{74, 6}_2 ∧  b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨  b^{74, 6}_0 ∨  p_444 ∨ break
c  in DIMACS:
-18287 -18288  18289  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 6}_2 ∧ -b^{74, 6}_1 ∧ -b^{74, 6}_0 ∧ true) 
c  in CNF:
c    -b^{74, 6}_2 ∨  b^{74, 6}_1 ∨  b^{74, 6}_0 ∨ false 
c  in DIMACS:
-18287  18288  18289  0

c  3 does not represent an automaton state.
c    -(-b^{74, 6}_2 ∧  b^{74, 6}_1 ∧  b^{74, 6}_0 ∧ true) 
c  in CNF:
c     b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ false 
c  in DIMACS:
 18287 -18288 -18289  0
c  -3 does not represent an automaton state.
c    -( b^{74, 6}_2 ∧  b^{74, 6}_1 ∧  b^{74, 6}_0 ∧ true) 
c  in CNF:
c    -b^{74, 6}_2 ∨ -b^{74, 6}_1 ∨ -b^{74, 6}_0 ∨ false 
c  in DIMACS:
-18287 -18288 -18289  0

c i = 7
c  -2+1 --> -1
c    ( b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧  p_518) -> ( b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0)
c  in CNF:
c    -b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨  b^{74, 8}_2
c    -b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_1
c    -b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨  b^{74, 8}_0
c  in DIMACS:
-18290 -18291  18292 -518  18293 0
-18290 -18291  18292 -518 -18294 0
-18290 -18291  18292 -518  18295 0

c  -1+1 --> 0
c    ( b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0 ∧  p_518) -> (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧ -b^{74, 8}_0)
c  in CNF:
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_2
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_1
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_0
c  in DIMACS:
-18290  18291 -18292 -518 -18293 0
-18290  18291 -18292 -518 -18294 0
-18290  18291 -18292 -518 -18295 0

c  0+1 --> 1
c    (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧  p_518) -> (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0)
c  in CNF:
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_2
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_1
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨  b^{74, 8}_0
c  in DIMACS:
 18290  18291  18292 -518 -18293 0
 18290  18291  18292 -518 -18294 0
 18290  18291  18292 -518  18295 0

c  1+1 --> 2
c    (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0 ∧  p_518) -> (-b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0)
c  in CNF:
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_2
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨  b^{74, 8}_1
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ -p_518 ∨ -b^{74, 8}_0
c  in DIMACS:
 18290  18291 -18292 -518 -18293 0
 18290  18291 -18292 -518  18294 0
 18290  18291 -18292 -518 -18295 0

c  2+1 --> break 
c    (-b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧  p_518) -> break
c  in CNF:
c     b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 18290 -18291  18292 -518 1162 0


c  2-1 --> 1
c    (-b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧ -p_518) -> (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0)
c  in CNF:
c     b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_2
c     b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_1
c     b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨  b^{74, 8}_0
c  in DIMACS:
 18290 -18291  18292  518 -18293 0
 18290 -18291  18292  518 -18294 0
 18290 -18291  18292  518  18295 0

c  1-1 --> 0
c    (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0 ∧ -p_518) -> (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧ -b^{74, 8}_0)
c  in CNF:
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_2
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_1
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_0
c  in DIMACS:
 18290  18291 -18292  518 -18293 0
 18290  18291 -18292  518 -18294 0
 18290  18291 -18292  518 -18295 0

c  0-1 --> -1
c    (-b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧ -p_518) -> ( b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0)
c  in CNF:
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨  b^{74, 8}_2
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_1
c     b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨  b^{74, 8}_0
c  in DIMACS:
 18290  18291  18292  518  18293 0
 18290  18291  18292  518 -18294 0
 18290  18291  18292  518  18295 0

c  -1-1 --> -2
c    ( b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧  b^{74, 7}_0 ∧ -p_518) -> ( b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0)
c  in CNF:
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨  b^{74, 8}_2
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨  b^{74, 8}_1
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨  p_518 ∨ -b^{74, 8}_0
c  in DIMACS:
-18290  18291 -18292  518  18293 0
-18290  18291 -18292  518  18294 0
-18290  18291 -18292  518 -18295 0

c  -2-1 --> break 
c    ( b^{74, 7}_2 ∧  b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨  b^{74, 7}_0 ∨  p_518 ∨ break
c  in DIMACS:
-18290 -18291  18292  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 7}_2 ∧ -b^{74, 7}_1 ∧ -b^{74, 7}_0 ∧ true) 
c  in CNF:
c    -b^{74, 7}_2 ∨  b^{74, 7}_1 ∨  b^{74, 7}_0 ∨ false 
c  in DIMACS:
-18290  18291  18292  0

c  3 does not represent an automaton state.
c    -(-b^{74, 7}_2 ∧  b^{74, 7}_1 ∧  b^{74, 7}_0 ∧ true) 
c  in CNF:
c     b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ false 
c  in DIMACS:
 18290 -18291 -18292  0
c  -3 does not represent an automaton state.
c    -( b^{74, 7}_2 ∧  b^{74, 7}_1 ∧  b^{74, 7}_0 ∧ true) 
c  in CNF:
c    -b^{74, 7}_2 ∨ -b^{74, 7}_1 ∨ -b^{74, 7}_0 ∨ false 
c  in DIMACS:
-18290 -18291 -18292  0

c i = 8
c  -2+1 --> -1
c    ( b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧  p_592) -> ( b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0)
c  in CNF:
c    -b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨  b^{74, 9}_2
c    -b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_1
c    -b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨  b^{74, 9}_0
c  in DIMACS:
-18293 -18294  18295 -592  18296 0
-18293 -18294  18295 -592 -18297 0
-18293 -18294  18295 -592  18298 0

c  -1+1 --> 0
c    ( b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0 ∧  p_592) -> (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧ -b^{74, 9}_0)
c  in CNF:
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_2
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_1
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_0
c  in DIMACS:
-18293  18294 -18295 -592 -18296 0
-18293  18294 -18295 -592 -18297 0
-18293  18294 -18295 -592 -18298 0

c  0+1 --> 1
c    (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧  p_592) -> (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0)
c  in CNF:
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_2
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_1
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨  b^{74, 9}_0
c  in DIMACS:
 18293  18294  18295 -592 -18296 0
 18293  18294  18295 -592 -18297 0
 18293  18294  18295 -592  18298 0

c  1+1 --> 2
c    (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0 ∧  p_592) -> (-b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0)
c  in CNF:
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_2
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨  b^{74, 9}_1
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ -p_592 ∨ -b^{74, 9}_0
c  in DIMACS:
 18293  18294 -18295 -592 -18296 0
 18293  18294 -18295 -592  18297 0
 18293  18294 -18295 -592 -18298 0

c  2+1 --> break 
c    (-b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧  p_592) -> break
c  in CNF:
c     b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 18293 -18294  18295 -592 1162 0


c  2-1 --> 1
c    (-b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧ -p_592) -> (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0)
c  in CNF:
c     b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_2
c     b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_1
c     b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨  b^{74, 9}_0
c  in DIMACS:
 18293 -18294  18295  592 -18296 0
 18293 -18294  18295  592 -18297 0
 18293 -18294  18295  592  18298 0

c  1-1 --> 0
c    (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0 ∧ -p_592) -> (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧ -b^{74, 9}_0)
c  in CNF:
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_2
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_1
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_0
c  in DIMACS:
 18293  18294 -18295  592 -18296 0
 18293  18294 -18295  592 -18297 0
 18293  18294 -18295  592 -18298 0

c  0-1 --> -1
c    (-b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧ -p_592) -> ( b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0)
c  in CNF:
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨  b^{74, 9}_2
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_1
c     b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨  b^{74, 9}_0
c  in DIMACS:
 18293  18294  18295  592  18296 0
 18293  18294  18295  592 -18297 0
 18293  18294  18295  592  18298 0

c  -1-1 --> -2
c    ( b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧  b^{74, 8}_0 ∧ -p_592) -> ( b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0)
c  in CNF:
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨  b^{74, 9}_2
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨  b^{74, 9}_1
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨  p_592 ∨ -b^{74, 9}_0
c  in DIMACS:
-18293  18294 -18295  592  18296 0
-18293  18294 -18295  592  18297 0
-18293  18294 -18295  592 -18298 0

c  -2-1 --> break 
c    ( b^{74, 8}_2 ∧  b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨  b^{74, 8}_0 ∨  p_592 ∨ break
c  in DIMACS:
-18293 -18294  18295  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 8}_2 ∧ -b^{74, 8}_1 ∧ -b^{74, 8}_0 ∧ true) 
c  in CNF:
c    -b^{74, 8}_2 ∨  b^{74, 8}_1 ∨  b^{74, 8}_0 ∨ false 
c  in DIMACS:
-18293  18294  18295  0

c  3 does not represent an automaton state.
c    -(-b^{74, 8}_2 ∧  b^{74, 8}_1 ∧  b^{74, 8}_0 ∧ true) 
c  in CNF:
c     b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ false 
c  in DIMACS:
 18293 -18294 -18295  0
c  -3 does not represent an automaton state.
c    -( b^{74, 8}_2 ∧  b^{74, 8}_1 ∧  b^{74, 8}_0 ∧ true) 
c  in CNF:
c    -b^{74, 8}_2 ∨ -b^{74, 8}_1 ∨ -b^{74, 8}_0 ∨ false 
c  in DIMACS:
-18293 -18294 -18295  0

c i = 9
c  -2+1 --> -1
c    ( b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧  p_666) -> ( b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0)
c  in CNF:
c    -b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨  b^{74, 10}_2
c    -b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_1
c    -b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨  b^{74, 10}_0
c  in DIMACS:
-18296 -18297  18298 -666  18299 0
-18296 -18297  18298 -666 -18300 0
-18296 -18297  18298 -666  18301 0

c  -1+1 --> 0
c    ( b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0 ∧  p_666) -> (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧ -b^{74, 10}_0)
c  in CNF:
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_2
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_1
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_0
c  in DIMACS:
-18296  18297 -18298 -666 -18299 0
-18296  18297 -18298 -666 -18300 0
-18296  18297 -18298 -666 -18301 0

c  0+1 --> 1
c    (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧  p_666) -> (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0)
c  in CNF:
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_2
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_1
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨  b^{74, 10}_0
c  in DIMACS:
 18296  18297  18298 -666 -18299 0
 18296  18297  18298 -666 -18300 0
 18296  18297  18298 -666  18301 0

c  1+1 --> 2
c    (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0 ∧  p_666) -> (-b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0)
c  in CNF:
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_2
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨  b^{74, 10}_1
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ -p_666 ∨ -b^{74, 10}_0
c  in DIMACS:
 18296  18297 -18298 -666 -18299 0
 18296  18297 -18298 -666  18300 0
 18296  18297 -18298 -666 -18301 0

c  2+1 --> break 
c    (-b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧  p_666) -> break
c  in CNF:
c     b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 18296 -18297  18298 -666 1162 0


c  2-1 --> 1
c    (-b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧ -p_666) -> (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0)
c  in CNF:
c     b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_2
c     b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_1
c     b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨  b^{74, 10}_0
c  in DIMACS:
 18296 -18297  18298  666 -18299 0
 18296 -18297  18298  666 -18300 0
 18296 -18297  18298  666  18301 0

c  1-1 --> 0
c    (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0 ∧ -p_666) -> (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧ -b^{74, 10}_0)
c  in CNF:
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_2
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_1
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_0
c  in DIMACS:
 18296  18297 -18298  666 -18299 0
 18296  18297 -18298  666 -18300 0
 18296  18297 -18298  666 -18301 0

c  0-1 --> -1
c    (-b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧ -p_666) -> ( b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0)
c  in CNF:
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨  b^{74, 10}_2
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_1
c     b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨  b^{74, 10}_0
c  in DIMACS:
 18296  18297  18298  666  18299 0
 18296  18297  18298  666 -18300 0
 18296  18297  18298  666  18301 0

c  -1-1 --> -2
c    ( b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧  b^{74, 9}_0 ∧ -p_666) -> ( b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0)
c  in CNF:
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨  b^{74, 10}_2
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨  b^{74, 10}_1
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨  p_666 ∨ -b^{74, 10}_0
c  in DIMACS:
-18296  18297 -18298  666  18299 0
-18296  18297 -18298  666  18300 0
-18296  18297 -18298  666 -18301 0

c  -2-1 --> break 
c    ( b^{74, 9}_2 ∧  b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨  b^{74, 9}_0 ∨  p_666 ∨ break
c  in DIMACS:
-18296 -18297  18298  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 9}_2 ∧ -b^{74, 9}_1 ∧ -b^{74, 9}_0 ∧ true) 
c  in CNF:
c    -b^{74, 9}_2 ∨  b^{74, 9}_1 ∨  b^{74, 9}_0 ∨ false 
c  in DIMACS:
-18296  18297  18298  0

c  3 does not represent an automaton state.
c    -(-b^{74, 9}_2 ∧  b^{74, 9}_1 ∧  b^{74, 9}_0 ∧ true) 
c  in CNF:
c     b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ false 
c  in DIMACS:
 18296 -18297 -18298  0
c  -3 does not represent an automaton state.
c    -( b^{74, 9}_2 ∧  b^{74, 9}_1 ∧  b^{74, 9}_0 ∧ true) 
c  in CNF:
c    -b^{74, 9}_2 ∨ -b^{74, 9}_1 ∨ -b^{74, 9}_0 ∨ false 
c  in DIMACS:
-18296 -18297 -18298  0

c i = 10
c  -2+1 --> -1
c    ( b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧  p_740) -> ( b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0)
c  in CNF:
c    -b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨  b^{74, 11}_2
c    -b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_1
c    -b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨  b^{74, 11}_0
c  in DIMACS:
-18299 -18300  18301 -740  18302 0
-18299 -18300  18301 -740 -18303 0
-18299 -18300  18301 -740  18304 0

c  -1+1 --> 0
c    ( b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0 ∧  p_740) -> (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧ -b^{74, 11}_0)
c  in CNF:
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_2
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_1
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_0
c  in DIMACS:
-18299  18300 -18301 -740 -18302 0
-18299  18300 -18301 -740 -18303 0
-18299  18300 -18301 -740 -18304 0

c  0+1 --> 1
c    (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧  p_740) -> (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0)
c  in CNF:
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_2
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_1
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨  b^{74, 11}_0
c  in DIMACS:
 18299  18300  18301 -740 -18302 0
 18299  18300  18301 -740 -18303 0
 18299  18300  18301 -740  18304 0

c  1+1 --> 2
c    (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0 ∧  p_740) -> (-b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0)
c  in CNF:
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_2
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨  b^{74, 11}_1
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ -p_740 ∨ -b^{74, 11}_0
c  in DIMACS:
 18299  18300 -18301 -740 -18302 0
 18299  18300 -18301 -740  18303 0
 18299  18300 -18301 -740 -18304 0

c  2+1 --> break 
c    (-b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧  p_740) -> break
c  in CNF:
c     b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 18299 -18300  18301 -740 1162 0


c  2-1 --> 1
c    (-b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧ -p_740) -> (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0)
c  in CNF:
c     b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_2
c     b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_1
c     b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨  b^{74, 11}_0
c  in DIMACS:
 18299 -18300  18301  740 -18302 0
 18299 -18300  18301  740 -18303 0
 18299 -18300  18301  740  18304 0

c  1-1 --> 0
c    (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0 ∧ -p_740) -> (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧ -b^{74, 11}_0)
c  in CNF:
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_2
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_1
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_0
c  in DIMACS:
 18299  18300 -18301  740 -18302 0
 18299  18300 -18301  740 -18303 0
 18299  18300 -18301  740 -18304 0

c  0-1 --> -1
c    (-b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧ -p_740) -> ( b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0)
c  in CNF:
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨  b^{74, 11}_2
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_1
c     b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨  b^{74, 11}_0
c  in DIMACS:
 18299  18300  18301  740  18302 0
 18299  18300  18301  740 -18303 0
 18299  18300  18301  740  18304 0

c  -1-1 --> -2
c    ( b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧  b^{74, 10}_0 ∧ -p_740) -> ( b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0)
c  in CNF:
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨  b^{74, 11}_2
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨  b^{74, 11}_1
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨  p_740 ∨ -b^{74, 11}_0
c  in DIMACS:
-18299  18300 -18301  740  18302 0
-18299  18300 -18301  740  18303 0
-18299  18300 -18301  740 -18304 0

c  -2-1 --> break 
c    ( b^{74, 10}_2 ∧  b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨  b^{74, 10}_0 ∨  p_740 ∨ break
c  in DIMACS:
-18299 -18300  18301  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 10}_2 ∧ -b^{74, 10}_1 ∧ -b^{74, 10}_0 ∧ true) 
c  in CNF:
c    -b^{74, 10}_2 ∨  b^{74, 10}_1 ∨  b^{74, 10}_0 ∨ false 
c  in DIMACS:
-18299  18300  18301  0

c  3 does not represent an automaton state.
c    -(-b^{74, 10}_2 ∧  b^{74, 10}_1 ∧  b^{74, 10}_0 ∧ true) 
c  in CNF:
c     b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ false 
c  in DIMACS:
 18299 -18300 -18301  0
c  -3 does not represent an automaton state.
c    -( b^{74, 10}_2 ∧  b^{74, 10}_1 ∧  b^{74, 10}_0 ∧ true) 
c  in CNF:
c    -b^{74, 10}_2 ∨ -b^{74, 10}_1 ∨ -b^{74, 10}_0 ∨ false 
c  in DIMACS:
-18299 -18300 -18301  0

c i = 11
c  -2+1 --> -1
c    ( b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧  p_814) -> ( b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0)
c  in CNF:
c    -b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨  b^{74, 12}_2
c    -b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_1
c    -b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨  b^{74, 12}_0
c  in DIMACS:
-18302 -18303  18304 -814  18305 0
-18302 -18303  18304 -814 -18306 0
-18302 -18303  18304 -814  18307 0

c  -1+1 --> 0
c    ( b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0 ∧  p_814) -> (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧ -b^{74, 12}_0)
c  in CNF:
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_2
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_1
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_0
c  in DIMACS:
-18302  18303 -18304 -814 -18305 0
-18302  18303 -18304 -814 -18306 0
-18302  18303 -18304 -814 -18307 0

c  0+1 --> 1
c    (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧  p_814) -> (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0)
c  in CNF:
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_2
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_1
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨  b^{74, 12}_0
c  in DIMACS:
 18302  18303  18304 -814 -18305 0
 18302  18303  18304 -814 -18306 0
 18302  18303  18304 -814  18307 0

c  1+1 --> 2
c    (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0 ∧  p_814) -> (-b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0)
c  in CNF:
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_2
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨  b^{74, 12}_1
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ -p_814 ∨ -b^{74, 12}_0
c  in DIMACS:
 18302  18303 -18304 -814 -18305 0
 18302  18303 -18304 -814  18306 0
 18302  18303 -18304 -814 -18307 0

c  2+1 --> break 
c    (-b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧  p_814) -> break
c  in CNF:
c     b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ -p_814 ∨ break
c  in DIMACS:
 18302 -18303  18304 -814 1162 0


c  2-1 --> 1
c    (-b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧ -p_814) -> (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0)
c  in CNF:
c     b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_2
c     b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_1
c     b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨  b^{74, 12}_0
c  in DIMACS:
 18302 -18303  18304  814 -18305 0
 18302 -18303  18304  814 -18306 0
 18302 -18303  18304  814  18307 0

c  1-1 --> 0
c    (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0 ∧ -p_814) -> (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧ -b^{74, 12}_0)
c  in CNF:
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_2
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_1
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_0
c  in DIMACS:
 18302  18303 -18304  814 -18305 0
 18302  18303 -18304  814 -18306 0
 18302  18303 -18304  814 -18307 0

c  0-1 --> -1
c    (-b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧ -p_814) -> ( b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0)
c  in CNF:
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨  b^{74, 12}_2
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_1
c     b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨  b^{74, 12}_0
c  in DIMACS:
 18302  18303  18304  814  18305 0
 18302  18303  18304  814 -18306 0
 18302  18303  18304  814  18307 0

c  -1-1 --> -2
c    ( b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧  b^{74, 11}_0 ∧ -p_814) -> ( b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0)
c  in CNF:
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨  b^{74, 12}_2
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨  b^{74, 12}_1
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨  p_814 ∨ -b^{74, 12}_0
c  in DIMACS:
-18302  18303 -18304  814  18305 0
-18302  18303 -18304  814  18306 0
-18302  18303 -18304  814 -18307 0

c  -2-1 --> break 
c    ( b^{74, 11}_2 ∧  b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧ -p_814) -> break
c  in CNF:
c    -b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨  b^{74, 11}_0 ∨  p_814 ∨ break
c  in DIMACS:
-18302 -18303  18304  814 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 11}_2 ∧ -b^{74, 11}_1 ∧ -b^{74, 11}_0 ∧ true) 
c  in CNF:
c    -b^{74, 11}_2 ∨  b^{74, 11}_1 ∨  b^{74, 11}_0 ∨ false 
c  in DIMACS:
-18302  18303  18304  0

c  3 does not represent an automaton state.
c    -(-b^{74, 11}_2 ∧  b^{74, 11}_1 ∧  b^{74, 11}_0 ∧ true) 
c  in CNF:
c     b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ false 
c  in DIMACS:
 18302 -18303 -18304  0
c  -3 does not represent an automaton state.
c    -( b^{74, 11}_2 ∧  b^{74, 11}_1 ∧  b^{74, 11}_0 ∧ true) 
c  in CNF:
c    -b^{74, 11}_2 ∨ -b^{74, 11}_1 ∨ -b^{74, 11}_0 ∨ false 
c  in DIMACS:
-18302 -18303 -18304  0

c i = 12
c  -2+1 --> -1
c    ( b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧  p_888) -> ( b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0)
c  in CNF:
c    -b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨  b^{74, 13}_2
c    -b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_1
c    -b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨  b^{74, 13}_0
c  in DIMACS:
-18305 -18306  18307 -888  18308 0
-18305 -18306  18307 -888 -18309 0
-18305 -18306  18307 -888  18310 0

c  -1+1 --> 0
c    ( b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0 ∧  p_888) -> (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧ -b^{74, 13}_0)
c  in CNF:
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_2
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_1
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_0
c  in DIMACS:
-18305  18306 -18307 -888 -18308 0
-18305  18306 -18307 -888 -18309 0
-18305  18306 -18307 -888 -18310 0

c  0+1 --> 1
c    (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧  p_888) -> (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0)
c  in CNF:
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_2
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_1
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨  b^{74, 13}_0
c  in DIMACS:
 18305  18306  18307 -888 -18308 0
 18305  18306  18307 -888 -18309 0
 18305  18306  18307 -888  18310 0

c  1+1 --> 2
c    (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0 ∧  p_888) -> (-b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0)
c  in CNF:
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_2
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨  b^{74, 13}_1
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ -p_888 ∨ -b^{74, 13}_0
c  in DIMACS:
 18305  18306 -18307 -888 -18308 0
 18305  18306 -18307 -888  18309 0
 18305  18306 -18307 -888 -18310 0

c  2+1 --> break 
c    (-b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧  p_888) -> break
c  in CNF:
c     b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 18305 -18306  18307 -888 1162 0


c  2-1 --> 1
c    (-b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧ -p_888) -> (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0)
c  in CNF:
c     b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_2
c     b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_1
c     b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨  b^{74, 13}_0
c  in DIMACS:
 18305 -18306  18307  888 -18308 0
 18305 -18306  18307  888 -18309 0
 18305 -18306  18307  888  18310 0

c  1-1 --> 0
c    (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0 ∧ -p_888) -> (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧ -b^{74, 13}_0)
c  in CNF:
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_2
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_1
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_0
c  in DIMACS:
 18305  18306 -18307  888 -18308 0
 18305  18306 -18307  888 -18309 0
 18305  18306 -18307  888 -18310 0

c  0-1 --> -1
c    (-b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧ -p_888) -> ( b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0)
c  in CNF:
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨  b^{74, 13}_2
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_1
c     b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨  b^{74, 13}_0
c  in DIMACS:
 18305  18306  18307  888  18308 0
 18305  18306  18307  888 -18309 0
 18305  18306  18307  888  18310 0

c  -1-1 --> -2
c    ( b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧  b^{74, 12}_0 ∧ -p_888) -> ( b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0)
c  in CNF:
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨  b^{74, 13}_2
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨  b^{74, 13}_1
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨  p_888 ∨ -b^{74, 13}_0
c  in DIMACS:
-18305  18306 -18307  888  18308 0
-18305  18306 -18307  888  18309 0
-18305  18306 -18307  888 -18310 0

c  -2-1 --> break 
c    ( b^{74, 12}_2 ∧  b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨  b^{74, 12}_0 ∨  p_888 ∨ break
c  in DIMACS:
-18305 -18306  18307  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 12}_2 ∧ -b^{74, 12}_1 ∧ -b^{74, 12}_0 ∧ true) 
c  in CNF:
c    -b^{74, 12}_2 ∨  b^{74, 12}_1 ∨  b^{74, 12}_0 ∨ false 
c  in DIMACS:
-18305  18306  18307  0

c  3 does not represent an automaton state.
c    -(-b^{74, 12}_2 ∧  b^{74, 12}_1 ∧  b^{74, 12}_0 ∧ true) 
c  in CNF:
c     b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ false 
c  in DIMACS:
 18305 -18306 -18307  0
c  -3 does not represent an automaton state.
c    -( b^{74, 12}_2 ∧  b^{74, 12}_1 ∧  b^{74, 12}_0 ∧ true) 
c  in CNF:
c    -b^{74, 12}_2 ∨ -b^{74, 12}_1 ∨ -b^{74, 12}_0 ∨ false 
c  in DIMACS:
-18305 -18306 -18307  0

c i = 13
c  -2+1 --> -1
c    ( b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧  p_962) -> ( b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0)
c  in CNF:
c    -b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨  b^{74, 14}_2
c    -b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_1
c    -b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨  b^{74, 14}_0
c  in DIMACS:
-18308 -18309  18310 -962  18311 0
-18308 -18309  18310 -962 -18312 0
-18308 -18309  18310 -962  18313 0

c  -1+1 --> 0
c    ( b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0 ∧  p_962) -> (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧ -b^{74, 14}_0)
c  in CNF:
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_2
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_1
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_0
c  in DIMACS:
-18308  18309 -18310 -962 -18311 0
-18308  18309 -18310 -962 -18312 0
-18308  18309 -18310 -962 -18313 0

c  0+1 --> 1
c    (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧  p_962) -> (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0)
c  in CNF:
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_2
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_1
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨  b^{74, 14}_0
c  in DIMACS:
 18308  18309  18310 -962 -18311 0
 18308  18309  18310 -962 -18312 0
 18308  18309  18310 -962  18313 0

c  1+1 --> 2
c    (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0 ∧  p_962) -> (-b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0)
c  in CNF:
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_2
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨  b^{74, 14}_1
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ -p_962 ∨ -b^{74, 14}_0
c  in DIMACS:
 18308  18309 -18310 -962 -18311 0
 18308  18309 -18310 -962  18312 0
 18308  18309 -18310 -962 -18313 0

c  2+1 --> break 
c    (-b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧  p_962) -> break
c  in CNF:
c     b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ -p_962 ∨ break
c  in DIMACS:
 18308 -18309  18310 -962 1162 0


c  2-1 --> 1
c    (-b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧ -p_962) -> (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0)
c  in CNF:
c     b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_2
c     b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_1
c     b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨  b^{74, 14}_0
c  in DIMACS:
 18308 -18309  18310  962 -18311 0
 18308 -18309  18310  962 -18312 0
 18308 -18309  18310  962  18313 0

c  1-1 --> 0
c    (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0 ∧ -p_962) -> (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧ -b^{74, 14}_0)
c  in CNF:
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_2
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_1
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_0
c  in DIMACS:
 18308  18309 -18310  962 -18311 0
 18308  18309 -18310  962 -18312 0
 18308  18309 -18310  962 -18313 0

c  0-1 --> -1
c    (-b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧ -p_962) -> ( b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0)
c  in CNF:
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨  b^{74, 14}_2
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_1
c     b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨  b^{74, 14}_0
c  in DIMACS:
 18308  18309  18310  962  18311 0
 18308  18309  18310  962 -18312 0
 18308  18309  18310  962  18313 0

c  -1-1 --> -2
c    ( b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧  b^{74, 13}_0 ∧ -p_962) -> ( b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0)
c  in CNF:
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨  b^{74, 14}_2
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨  b^{74, 14}_1
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨  p_962 ∨ -b^{74, 14}_0
c  in DIMACS:
-18308  18309 -18310  962  18311 0
-18308  18309 -18310  962  18312 0
-18308  18309 -18310  962 -18313 0

c  -2-1 --> break 
c    ( b^{74, 13}_2 ∧  b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧ -p_962) -> break
c  in CNF:
c    -b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨  b^{74, 13}_0 ∨  p_962 ∨ break
c  in DIMACS:
-18308 -18309  18310  962 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 13}_2 ∧ -b^{74, 13}_1 ∧ -b^{74, 13}_0 ∧ true) 
c  in CNF:
c    -b^{74, 13}_2 ∨  b^{74, 13}_1 ∨  b^{74, 13}_0 ∨ false 
c  in DIMACS:
-18308  18309  18310  0

c  3 does not represent an automaton state.
c    -(-b^{74, 13}_2 ∧  b^{74, 13}_1 ∧  b^{74, 13}_0 ∧ true) 
c  in CNF:
c     b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ false 
c  in DIMACS:
 18308 -18309 -18310  0
c  -3 does not represent an automaton state.
c    -( b^{74, 13}_2 ∧  b^{74, 13}_1 ∧  b^{74, 13}_0 ∧ true) 
c  in CNF:
c    -b^{74, 13}_2 ∨ -b^{74, 13}_1 ∨ -b^{74, 13}_0 ∨ false 
c  in DIMACS:
-18308 -18309 -18310  0

c i = 14
c  -2+1 --> -1
c    ( b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧  p_1036) -> ( b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0)
c  in CNF:
c    -b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨  b^{74, 15}_2
c    -b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_1
c    -b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨  b^{74, 15}_0
c  in DIMACS:
-18311 -18312  18313 -1036  18314 0
-18311 -18312  18313 -1036 -18315 0
-18311 -18312  18313 -1036  18316 0

c  -1+1 --> 0
c    ( b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0 ∧  p_1036) -> (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧ -b^{74, 15}_0)
c  in CNF:
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_2
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_1
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_0
c  in DIMACS:
-18311  18312 -18313 -1036 -18314 0
-18311  18312 -18313 -1036 -18315 0
-18311  18312 -18313 -1036 -18316 0

c  0+1 --> 1
c    (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧  p_1036) -> (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0)
c  in CNF:
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_2
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_1
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨  b^{74, 15}_0
c  in DIMACS:
 18311  18312  18313 -1036 -18314 0
 18311  18312  18313 -1036 -18315 0
 18311  18312  18313 -1036  18316 0

c  1+1 --> 2
c    (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0 ∧  p_1036) -> (-b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0)
c  in CNF:
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_2
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨  b^{74, 15}_1
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ -p_1036 ∨ -b^{74, 15}_0
c  in DIMACS:
 18311  18312 -18313 -1036 -18314 0
 18311  18312 -18313 -1036  18315 0
 18311  18312 -18313 -1036 -18316 0

c  2+1 --> break 
c    (-b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 18311 -18312  18313 -1036 1162 0


c  2-1 --> 1
c    (-b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧ -p_1036) -> (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0)
c  in CNF:
c     b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_2
c     b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_1
c     b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨  b^{74, 15}_0
c  in DIMACS:
 18311 -18312  18313  1036 -18314 0
 18311 -18312  18313  1036 -18315 0
 18311 -18312  18313  1036  18316 0

c  1-1 --> 0
c    (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0 ∧ -p_1036) -> (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧ -b^{74, 15}_0)
c  in CNF:
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_2
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_1
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_0
c  in DIMACS:
 18311  18312 -18313  1036 -18314 0
 18311  18312 -18313  1036 -18315 0
 18311  18312 -18313  1036 -18316 0

c  0-1 --> -1
c    (-b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧ -p_1036) -> ( b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0)
c  in CNF:
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨  b^{74, 15}_2
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_1
c     b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨  b^{74, 15}_0
c  in DIMACS:
 18311  18312  18313  1036  18314 0
 18311  18312  18313  1036 -18315 0
 18311  18312  18313  1036  18316 0

c  -1-1 --> -2
c    ( b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧  b^{74, 14}_0 ∧ -p_1036) -> ( b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0)
c  in CNF:
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨  b^{74, 15}_2
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨  b^{74, 15}_1
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨  p_1036 ∨ -b^{74, 15}_0
c  in DIMACS:
-18311  18312 -18313  1036  18314 0
-18311  18312 -18313  1036  18315 0
-18311  18312 -18313  1036 -18316 0

c  -2-1 --> break 
c    ( b^{74, 14}_2 ∧  b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨  b^{74, 14}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-18311 -18312  18313  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 14}_2 ∧ -b^{74, 14}_1 ∧ -b^{74, 14}_0 ∧ true) 
c  in CNF:
c    -b^{74, 14}_2 ∨  b^{74, 14}_1 ∨  b^{74, 14}_0 ∨ false 
c  in DIMACS:
-18311  18312  18313  0

c  3 does not represent an automaton state.
c    -(-b^{74, 14}_2 ∧  b^{74, 14}_1 ∧  b^{74, 14}_0 ∧ true) 
c  in CNF:
c     b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ false 
c  in DIMACS:
 18311 -18312 -18313  0
c  -3 does not represent an automaton state.
c    -( b^{74, 14}_2 ∧  b^{74, 14}_1 ∧  b^{74, 14}_0 ∧ true) 
c  in CNF:
c    -b^{74, 14}_2 ∨ -b^{74, 14}_1 ∨ -b^{74, 14}_0 ∨ false 
c  in DIMACS:
-18311 -18312 -18313  0

c i = 15
c  -2+1 --> -1
c    ( b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧  p_1110) -> ( b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧  b^{74, 16}_0)
c  in CNF:
c    -b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨  b^{74, 16}_2
c    -b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_1
c    -b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨  b^{74, 16}_0
c  in DIMACS:
-18314 -18315  18316 -1110  18317 0
-18314 -18315  18316 -1110 -18318 0
-18314 -18315  18316 -1110  18319 0

c  -1+1 --> 0
c    ( b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0 ∧  p_1110) -> (-b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧ -b^{74, 16}_0)
c  in CNF:
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_2
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_1
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_0
c  in DIMACS:
-18314  18315 -18316 -1110 -18317 0
-18314  18315 -18316 -1110 -18318 0
-18314  18315 -18316 -1110 -18319 0

c  0+1 --> 1
c    (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧  p_1110) -> (-b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧  b^{74, 16}_0)
c  in CNF:
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_2
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_1
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨  b^{74, 16}_0
c  in DIMACS:
 18314  18315  18316 -1110 -18317 0
 18314  18315  18316 -1110 -18318 0
 18314  18315  18316 -1110  18319 0

c  1+1 --> 2
c    (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0 ∧  p_1110) -> (-b^{74, 16}_2 ∧  b^{74, 16}_1 ∧ -b^{74, 16}_0)
c  in CNF:
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_2
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨  b^{74, 16}_1
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ -p_1110 ∨ -b^{74, 16}_0
c  in DIMACS:
 18314  18315 -18316 -1110 -18317 0
 18314  18315 -18316 -1110  18318 0
 18314  18315 -18316 -1110 -18319 0

c  2+1 --> break 
c    (-b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 18314 -18315  18316 -1110 1162 0


c  2-1 --> 1
c    (-b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧ -p_1110) -> (-b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧  b^{74, 16}_0)
c  in CNF:
c     b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_2
c     b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_1
c     b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨  b^{74, 16}_0
c  in DIMACS:
 18314 -18315  18316  1110 -18317 0
 18314 -18315  18316  1110 -18318 0
 18314 -18315  18316  1110  18319 0

c  1-1 --> 0
c    (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0 ∧ -p_1110) -> (-b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧ -b^{74, 16}_0)
c  in CNF:
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_2
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_1
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_0
c  in DIMACS:
 18314  18315 -18316  1110 -18317 0
 18314  18315 -18316  1110 -18318 0
 18314  18315 -18316  1110 -18319 0

c  0-1 --> -1
c    (-b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧ -p_1110) -> ( b^{74, 16}_2 ∧ -b^{74, 16}_1 ∧  b^{74, 16}_0)
c  in CNF:
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨  b^{74, 16}_2
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_1
c     b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨  b^{74, 16}_0
c  in DIMACS:
 18314  18315  18316  1110  18317 0
 18314  18315  18316  1110 -18318 0
 18314  18315  18316  1110  18319 0

c  -1-1 --> -2
c    ( b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧  b^{74, 15}_0 ∧ -p_1110) -> ( b^{74, 16}_2 ∧  b^{74, 16}_1 ∧ -b^{74, 16}_0)
c  in CNF:
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨  b^{74, 16}_2
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨  b^{74, 16}_1
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨  p_1110 ∨ -b^{74, 16}_0
c  in DIMACS:
-18314  18315 -18316  1110  18317 0
-18314  18315 -18316  1110  18318 0
-18314  18315 -18316  1110 -18319 0

c  -2-1 --> break 
c    ( b^{74, 15}_2 ∧  b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨  b^{74, 15}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-18314 -18315  18316  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{74, 15}_2 ∧ -b^{74, 15}_1 ∧ -b^{74, 15}_0 ∧ true) 
c  in CNF:
c    -b^{74, 15}_2 ∨  b^{74, 15}_1 ∨  b^{74, 15}_0 ∨ false 
c  in DIMACS:
-18314  18315  18316  0

c  3 does not represent an automaton state.
c    -(-b^{74, 15}_2 ∧  b^{74, 15}_1 ∧  b^{74, 15}_0 ∧ true) 
c  in CNF:
c     b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ false 
c  in DIMACS:
 18314 -18315 -18316  0
c  -3 does not represent an automaton state.
c    -( b^{74, 15}_2 ∧  b^{74, 15}_1 ∧  b^{74, 15}_0 ∧ true) 
c  in CNF:
c    -b^{74, 15}_2 ∨ -b^{74, 15}_1 ∨ -b^{74, 15}_0 ∨ false 
c  in DIMACS:
-18314 -18315 -18316  0

c INIT for k = 75
c    -b^{75, 1}_2
c    -b^{75, 1}_1
c    -b^{75, 1}_0
c  in DIMACS:
-18320 0
-18321 0
-18322 0

c Transitions for k = 75
c i = 1
c  -2+1 --> -1
c    ( b^{75, 1}_2 ∧  b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧  p_75) -> ( b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0)
c  in CNF:
c    -b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨  b^{75, 2}_2
c    -b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_1
c    -b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨  b^{75, 2}_0
c  in DIMACS:
-18320 -18321  18322 -75  18323 0
-18320 -18321  18322 -75 -18324 0
-18320 -18321  18322 -75  18325 0

c  -1+1 --> 0
c    ( b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧  b^{75, 1}_0 ∧  p_75) -> (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧ -b^{75, 2}_0)
c  in CNF:
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_2
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_1
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_0
c  in DIMACS:
-18320  18321 -18322 -75 -18323 0
-18320  18321 -18322 -75 -18324 0
-18320  18321 -18322 -75 -18325 0

c  0+1 --> 1
c    (-b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧  p_75) -> (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0)
c  in CNF:
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_2
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_1
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨  b^{75, 2}_0
c  in DIMACS:
 18320  18321  18322 -75 -18323 0
 18320  18321  18322 -75 -18324 0
 18320  18321  18322 -75  18325 0

c  1+1 --> 2
c    (-b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧  b^{75, 1}_0 ∧  p_75) -> (-b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0)
c  in CNF:
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_2
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨  b^{75, 2}_1
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ -p_75 ∨ -b^{75, 2}_0
c  in DIMACS:
 18320  18321 -18322 -75 -18323 0
 18320  18321 -18322 -75  18324 0
 18320  18321 -18322 -75 -18325 0

c  2+1 --> break 
c    (-b^{75, 1}_2 ∧  b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧  p_75) -> break
c  in CNF:
c     b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ -p_75 ∨ break
c  in DIMACS:
 18320 -18321  18322 -75 1162 0


c  2-1 --> 1
c    (-b^{75, 1}_2 ∧  b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧ -p_75) -> (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0)
c  in CNF:
c     b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_2
c     b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_1
c     b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨  b^{75, 2}_0
c  in DIMACS:
 18320 -18321  18322  75 -18323 0
 18320 -18321  18322  75 -18324 0
 18320 -18321  18322  75  18325 0

c  1-1 --> 0
c    (-b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧  b^{75, 1}_0 ∧ -p_75) -> (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧ -b^{75, 2}_0)
c  in CNF:
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_2
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_1
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_0
c  in DIMACS:
 18320  18321 -18322  75 -18323 0
 18320  18321 -18322  75 -18324 0
 18320  18321 -18322  75 -18325 0

c  0-1 --> -1
c    (-b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧ -p_75) -> ( b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0)
c  in CNF:
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨  b^{75, 2}_2
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_1
c     b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨  b^{75, 2}_0
c  in DIMACS:
 18320  18321  18322  75  18323 0
 18320  18321  18322  75 -18324 0
 18320  18321  18322  75  18325 0

c  -1-1 --> -2
c    ( b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧  b^{75, 1}_0 ∧ -p_75) -> ( b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0)
c  in CNF:
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨  b^{75, 2}_2
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨  b^{75, 2}_1
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨  p_75 ∨ -b^{75, 2}_0
c  in DIMACS:
-18320  18321 -18322  75  18323 0
-18320  18321 -18322  75  18324 0
-18320  18321 -18322  75 -18325 0

c  -2-1 --> break 
c    ( b^{75, 1}_2 ∧  b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧ -p_75) -> break
c  in CNF:
c    -b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨  b^{75, 1}_0 ∨  p_75 ∨ break
c  in DIMACS:
-18320 -18321  18322  75 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 1}_2 ∧ -b^{75, 1}_1 ∧ -b^{75, 1}_0 ∧ true) 
c  in CNF:
c    -b^{75, 1}_2 ∨  b^{75, 1}_1 ∨  b^{75, 1}_0 ∨ false 
c  in DIMACS:
-18320  18321  18322  0

c  3 does not represent an automaton state.
c    -(-b^{75, 1}_2 ∧  b^{75, 1}_1 ∧  b^{75, 1}_0 ∧ true) 
c  in CNF:
c     b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ false 
c  in DIMACS:
 18320 -18321 -18322  0
c  -3 does not represent an automaton state.
c    -( b^{75, 1}_2 ∧  b^{75, 1}_1 ∧  b^{75, 1}_0 ∧ true) 
c  in CNF:
c    -b^{75, 1}_2 ∨ -b^{75, 1}_1 ∨ -b^{75, 1}_0 ∨ false 
c  in DIMACS:
-18320 -18321 -18322  0

c i = 2
c  -2+1 --> -1
c    ( b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧  p_150) -> ( b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0)
c  in CNF:
c    -b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨  b^{75, 3}_2
c    -b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_1
c    -b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨  b^{75, 3}_0
c  in DIMACS:
-18323 -18324  18325 -150  18326 0
-18323 -18324  18325 -150 -18327 0
-18323 -18324  18325 -150  18328 0

c  -1+1 --> 0
c    ( b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0 ∧  p_150) -> (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧ -b^{75, 3}_0)
c  in CNF:
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_2
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_1
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_0
c  in DIMACS:
-18323  18324 -18325 -150 -18326 0
-18323  18324 -18325 -150 -18327 0
-18323  18324 -18325 -150 -18328 0

c  0+1 --> 1
c    (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧  p_150) -> (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0)
c  in CNF:
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_2
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_1
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨  b^{75, 3}_0
c  in DIMACS:
 18323  18324  18325 -150 -18326 0
 18323  18324  18325 -150 -18327 0
 18323  18324  18325 -150  18328 0

c  1+1 --> 2
c    (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0 ∧  p_150) -> (-b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0)
c  in CNF:
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_2
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨  b^{75, 3}_1
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ -p_150 ∨ -b^{75, 3}_0
c  in DIMACS:
 18323  18324 -18325 -150 -18326 0
 18323  18324 -18325 -150  18327 0
 18323  18324 -18325 -150 -18328 0

c  2+1 --> break 
c    (-b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧  p_150) -> break
c  in CNF:
c     b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 18323 -18324  18325 -150 1162 0


c  2-1 --> 1
c    (-b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧ -p_150) -> (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0)
c  in CNF:
c     b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_2
c     b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_1
c     b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨  b^{75, 3}_0
c  in DIMACS:
 18323 -18324  18325  150 -18326 0
 18323 -18324  18325  150 -18327 0
 18323 -18324  18325  150  18328 0

c  1-1 --> 0
c    (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0 ∧ -p_150) -> (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧ -b^{75, 3}_0)
c  in CNF:
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_2
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_1
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_0
c  in DIMACS:
 18323  18324 -18325  150 -18326 0
 18323  18324 -18325  150 -18327 0
 18323  18324 -18325  150 -18328 0

c  0-1 --> -1
c    (-b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧ -p_150) -> ( b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0)
c  in CNF:
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨  b^{75, 3}_2
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_1
c     b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨  b^{75, 3}_0
c  in DIMACS:
 18323  18324  18325  150  18326 0
 18323  18324  18325  150 -18327 0
 18323  18324  18325  150  18328 0

c  -1-1 --> -2
c    ( b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧  b^{75, 2}_0 ∧ -p_150) -> ( b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0)
c  in CNF:
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨  b^{75, 3}_2
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨  b^{75, 3}_1
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨  p_150 ∨ -b^{75, 3}_0
c  in DIMACS:
-18323  18324 -18325  150  18326 0
-18323  18324 -18325  150  18327 0
-18323  18324 -18325  150 -18328 0

c  -2-1 --> break 
c    ( b^{75, 2}_2 ∧  b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨  b^{75, 2}_0 ∨  p_150 ∨ break
c  in DIMACS:
-18323 -18324  18325  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 2}_2 ∧ -b^{75, 2}_1 ∧ -b^{75, 2}_0 ∧ true) 
c  in CNF:
c    -b^{75, 2}_2 ∨  b^{75, 2}_1 ∨  b^{75, 2}_0 ∨ false 
c  in DIMACS:
-18323  18324  18325  0

c  3 does not represent an automaton state.
c    -(-b^{75, 2}_2 ∧  b^{75, 2}_1 ∧  b^{75, 2}_0 ∧ true) 
c  in CNF:
c     b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ false 
c  in DIMACS:
 18323 -18324 -18325  0
c  -3 does not represent an automaton state.
c    -( b^{75, 2}_2 ∧  b^{75, 2}_1 ∧  b^{75, 2}_0 ∧ true) 
c  in CNF:
c    -b^{75, 2}_2 ∨ -b^{75, 2}_1 ∨ -b^{75, 2}_0 ∨ false 
c  in DIMACS:
-18323 -18324 -18325  0

c i = 3
c  -2+1 --> -1
c    ( b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧  p_225) -> ( b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0)
c  in CNF:
c    -b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨  b^{75, 4}_2
c    -b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_1
c    -b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨  b^{75, 4}_0
c  in DIMACS:
-18326 -18327  18328 -225  18329 0
-18326 -18327  18328 -225 -18330 0
-18326 -18327  18328 -225  18331 0

c  -1+1 --> 0
c    ( b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0 ∧  p_225) -> (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧ -b^{75, 4}_0)
c  in CNF:
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_2
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_1
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_0
c  in DIMACS:
-18326  18327 -18328 -225 -18329 0
-18326  18327 -18328 -225 -18330 0
-18326  18327 -18328 -225 -18331 0

c  0+1 --> 1
c    (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧  p_225) -> (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0)
c  in CNF:
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_2
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_1
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨  b^{75, 4}_0
c  in DIMACS:
 18326  18327  18328 -225 -18329 0
 18326  18327  18328 -225 -18330 0
 18326  18327  18328 -225  18331 0

c  1+1 --> 2
c    (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0 ∧  p_225) -> (-b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0)
c  in CNF:
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_2
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨  b^{75, 4}_1
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ -p_225 ∨ -b^{75, 4}_0
c  in DIMACS:
 18326  18327 -18328 -225 -18329 0
 18326  18327 -18328 -225  18330 0
 18326  18327 -18328 -225 -18331 0

c  2+1 --> break 
c    (-b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧  p_225) -> break
c  in CNF:
c     b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 18326 -18327  18328 -225 1162 0


c  2-1 --> 1
c    (-b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧ -p_225) -> (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0)
c  in CNF:
c     b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_2
c     b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_1
c     b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨  b^{75, 4}_0
c  in DIMACS:
 18326 -18327  18328  225 -18329 0
 18326 -18327  18328  225 -18330 0
 18326 -18327  18328  225  18331 0

c  1-1 --> 0
c    (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0 ∧ -p_225) -> (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧ -b^{75, 4}_0)
c  in CNF:
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_2
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_1
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_0
c  in DIMACS:
 18326  18327 -18328  225 -18329 0
 18326  18327 -18328  225 -18330 0
 18326  18327 -18328  225 -18331 0

c  0-1 --> -1
c    (-b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧ -p_225) -> ( b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0)
c  in CNF:
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨  b^{75, 4}_2
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_1
c     b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨  b^{75, 4}_0
c  in DIMACS:
 18326  18327  18328  225  18329 0
 18326  18327  18328  225 -18330 0
 18326  18327  18328  225  18331 0

c  -1-1 --> -2
c    ( b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧  b^{75, 3}_0 ∧ -p_225) -> ( b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0)
c  in CNF:
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨  b^{75, 4}_2
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨  b^{75, 4}_1
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨  p_225 ∨ -b^{75, 4}_0
c  in DIMACS:
-18326  18327 -18328  225  18329 0
-18326  18327 -18328  225  18330 0
-18326  18327 -18328  225 -18331 0

c  -2-1 --> break 
c    ( b^{75, 3}_2 ∧  b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨  b^{75, 3}_0 ∨  p_225 ∨ break
c  in DIMACS:
-18326 -18327  18328  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 3}_2 ∧ -b^{75, 3}_1 ∧ -b^{75, 3}_0 ∧ true) 
c  in CNF:
c    -b^{75, 3}_2 ∨  b^{75, 3}_1 ∨  b^{75, 3}_0 ∨ false 
c  in DIMACS:
-18326  18327  18328  0

c  3 does not represent an automaton state.
c    -(-b^{75, 3}_2 ∧  b^{75, 3}_1 ∧  b^{75, 3}_0 ∧ true) 
c  in CNF:
c     b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ false 
c  in DIMACS:
 18326 -18327 -18328  0
c  -3 does not represent an automaton state.
c    -( b^{75, 3}_2 ∧  b^{75, 3}_1 ∧  b^{75, 3}_0 ∧ true) 
c  in CNF:
c    -b^{75, 3}_2 ∨ -b^{75, 3}_1 ∨ -b^{75, 3}_0 ∨ false 
c  in DIMACS:
-18326 -18327 -18328  0

c i = 4
c  -2+1 --> -1
c    ( b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧  p_300) -> ( b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0)
c  in CNF:
c    -b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨  b^{75, 5}_2
c    -b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_1
c    -b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨  b^{75, 5}_0
c  in DIMACS:
-18329 -18330  18331 -300  18332 0
-18329 -18330  18331 -300 -18333 0
-18329 -18330  18331 -300  18334 0

c  -1+1 --> 0
c    ( b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0 ∧  p_300) -> (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧ -b^{75, 5}_0)
c  in CNF:
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_2
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_1
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_0
c  in DIMACS:
-18329  18330 -18331 -300 -18332 0
-18329  18330 -18331 -300 -18333 0
-18329  18330 -18331 -300 -18334 0

c  0+1 --> 1
c    (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧  p_300) -> (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0)
c  in CNF:
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_2
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_1
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨  b^{75, 5}_0
c  in DIMACS:
 18329  18330  18331 -300 -18332 0
 18329  18330  18331 -300 -18333 0
 18329  18330  18331 -300  18334 0

c  1+1 --> 2
c    (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0 ∧  p_300) -> (-b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0)
c  in CNF:
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_2
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨  b^{75, 5}_1
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ -p_300 ∨ -b^{75, 5}_0
c  in DIMACS:
 18329  18330 -18331 -300 -18332 0
 18329  18330 -18331 -300  18333 0
 18329  18330 -18331 -300 -18334 0

c  2+1 --> break 
c    (-b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧  p_300) -> break
c  in CNF:
c     b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 18329 -18330  18331 -300 1162 0


c  2-1 --> 1
c    (-b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧ -p_300) -> (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0)
c  in CNF:
c     b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_2
c     b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_1
c     b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨  b^{75, 5}_0
c  in DIMACS:
 18329 -18330  18331  300 -18332 0
 18329 -18330  18331  300 -18333 0
 18329 -18330  18331  300  18334 0

c  1-1 --> 0
c    (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0 ∧ -p_300) -> (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧ -b^{75, 5}_0)
c  in CNF:
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_2
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_1
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_0
c  in DIMACS:
 18329  18330 -18331  300 -18332 0
 18329  18330 -18331  300 -18333 0
 18329  18330 -18331  300 -18334 0

c  0-1 --> -1
c    (-b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧ -p_300) -> ( b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0)
c  in CNF:
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨  b^{75, 5}_2
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_1
c     b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨  b^{75, 5}_0
c  in DIMACS:
 18329  18330  18331  300  18332 0
 18329  18330  18331  300 -18333 0
 18329  18330  18331  300  18334 0

c  -1-1 --> -2
c    ( b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧  b^{75, 4}_0 ∧ -p_300) -> ( b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0)
c  in CNF:
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨  b^{75, 5}_2
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨  b^{75, 5}_1
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨  p_300 ∨ -b^{75, 5}_0
c  in DIMACS:
-18329  18330 -18331  300  18332 0
-18329  18330 -18331  300  18333 0
-18329  18330 -18331  300 -18334 0

c  -2-1 --> break 
c    ( b^{75, 4}_2 ∧  b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨  b^{75, 4}_0 ∨  p_300 ∨ break
c  in DIMACS:
-18329 -18330  18331  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 4}_2 ∧ -b^{75, 4}_1 ∧ -b^{75, 4}_0 ∧ true) 
c  in CNF:
c    -b^{75, 4}_2 ∨  b^{75, 4}_1 ∨  b^{75, 4}_0 ∨ false 
c  in DIMACS:
-18329  18330  18331  0

c  3 does not represent an automaton state.
c    -(-b^{75, 4}_2 ∧  b^{75, 4}_1 ∧  b^{75, 4}_0 ∧ true) 
c  in CNF:
c     b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ false 
c  in DIMACS:
 18329 -18330 -18331  0
c  -3 does not represent an automaton state.
c    -( b^{75, 4}_2 ∧  b^{75, 4}_1 ∧  b^{75, 4}_0 ∧ true) 
c  in CNF:
c    -b^{75, 4}_2 ∨ -b^{75, 4}_1 ∨ -b^{75, 4}_0 ∨ false 
c  in DIMACS:
-18329 -18330 -18331  0

c i = 5
c  -2+1 --> -1
c    ( b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧  p_375) -> ( b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0)
c  in CNF:
c    -b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨  b^{75, 6}_2
c    -b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_1
c    -b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨  b^{75, 6}_0
c  in DIMACS:
-18332 -18333  18334 -375  18335 0
-18332 -18333  18334 -375 -18336 0
-18332 -18333  18334 -375  18337 0

c  -1+1 --> 0
c    ( b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0 ∧  p_375) -> (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧ -b^{75, 6}_0)
c  in CNF:
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_2
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_1
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_0
c  in DIMACS:
-18332  18333 -18334 -375 -18335 0
-18332  18333 -18334 -375 -18336 0
-18332  18333 -18334 -375 -18337 0

c  0+1 --> 1
c    (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧  p_375) -> (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0)
c  in CNF:
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_2
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_1
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨  b^{75, 6}_0
c  in DIMACS:
 18332  18333  18334 -375 -18335 0
 18332  18333  18334 -375 -18336 0
 18332  18333  18334 -375  18337 0

c  1+1 --> 2
c    (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0 ∧  p_375) -> (-b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0)
c  in CNF:
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_2
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨  b^{75, 6}_1
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ -p_375 ∨ -b^{75, 6}_0
c  in DIMACS:
 18332  18333 -18334 -375 -18335 0
 18332  18333 -18334 -375  18336 0
 18332  18333 -18334 -375 -18337 0

c  2+1 --> break 
c    (-b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧  p_375) -> break
c  in CNF:
c     b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 18332 -18333  18334 -375 1162 0


c  2-1 --> 1
c    (-b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧ -p_375) -> (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0)
c  in CNF:
c     b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_2
c     b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_1
c     b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨  b^{75, 6}_0
c  in DIMACS:
 18332 -18333  18334  375 -18335 0
 18332 -18333  18334  375 -18336 0
 18332 -18333  18334  375  18337 0

c  1-1 --> 0
c    (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0 ∧ -p_375) -> (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧ -b^{75, 6}_0)
c  in CNF:
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_2
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_1
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_0
c  in DIMACS:
 18332  18333 -18334  375 -18335 0
 18332  18333 -18334  375 -18336 0
 18332  18333 -18334  375 -18337 0

c  0-1 --> -1
c    (-b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧ -p_375) -> ( b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0)
c  in CNF:
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨  b^{75, 6}_2
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_1
c     b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨  b^{75, 6}_0
c  in DIMACS:
 18332  18333  18334  375  18335 0
 18332  18333  18334  375 -18336 0
 18332  18333  18334  375  18337 0

c  -1-1 --> -2
c    ( b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧  b^{75, 5}_0 ∧ -p_375) -> ( b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0)
c  in CNF:
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨  b^{75, 6}_2
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨  b^{75, 6}_1
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨  p_375 ∨ -b^{75, 6}_0
c  in DIMACS:
-18332  18333 -18334  375  18335 0
-18332  18333 -18334  375  18336 0
-18332  18333 -18334  375 -18337 0

c  -2-1 --> break 
c    ( b^{75, 5}_2 ∧  b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨  b^{75, 5}_0 ∨  p_375 ∨ break
c  in DIMACS:
-18332 -18333  18334  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 5}_2 ∧ -b^{75, 5}_1 ∧ -b^{75, 5}_0 ∧ true) 
c  in CNF:
c    -b^{75, 5}_2 ∨  b^{75, 5}_1 ∨  b^{75, 5}_0 ∨ false 
c  in DIMACS:
-18332  18333  18334  0

c  3 does not represent an automaton state.
c    -(-b^{75, 5}_2 ∧  b^{75, 5}_1 ∧  b^{75, 5}_0 ∧ true) 
c  in CNF:
c     b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ false 
c  in DIMACS:
 18332 -18333 -18334  0
c  -3 does not represent an automaton state.
c    -( b^{75, 5}_2 ∧  b^{75, 5}_1 ∧  b^{75, 5}_0 ∧ true) 
c  in CNF:
c    -b^{75, 5}_2 ∨ -b^{75, 5}_1 ∨ -b^{75, 5}_0 ∨ false 
c  in DIMACS:
-18332 -18333 -18334  0

c i = 6
c  -2+1 --> -1
c    ( b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧  p_450) -> ( b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0)
c  in CNF:
c    -b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨  b^{75, 7}_2
c    -b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_1
c    -b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨  b^{75, 7}_0
c  in DIMACS:
-18335 -18336  18337 -450  18338 0
-18335 -18336  18337 -450 -18339 0
-18335 -18336  18337 -450  18340 0

c  -1+1 --> 0
c    ( b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0 ∧  p_450) -> (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧ -b^{75, 7}_0)
c  in CNF:
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_2
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_1
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_0
c  in DIMACS:
-18335  18336 -18337 -450 -18338 0
-18335  18336 -18337 -450 -18339 0
-18335  18336 -18337 -450 -18340 0

c  0+1 --> 1
c    (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧  p_450) -> (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0)
c  in CNF:
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_2
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_1
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨  b^{75, 7}_0
c  in DIMACS:
 18335  18336  18337 -450 -18338 0
 18335  18336  18337 -450 -18339 0
 18335  18336  18337 -450  18340 0

c  1+1 --> 2
c    (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0 ∧  p_450) -> (-b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0)
c  in CNF:
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_2
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨  b^{75, 7}_1
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ -p_450 ∨ -b^{75, 7}_0
c  in DIMACS:
 18335  18336 -18337 -450 -18338 0
 18335  18336 -18337 -450  18339 0
 18335  18336 -18337 -450 -18340 0

c  2+1 --> break 
c    (-b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧  p_450) -> break
c  in CNF:
c     b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 18335 -18336  18337 -450 1162 0


c  2-1 --> 1
c    (-b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧ -p_450) -> (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0)
c  in CNF:
c     b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_2
c     b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_1
c     b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨  b^{75, 7}_0
c  in DIMACS:
 18335 -18336  18337  450 -18338 0
 18335 -18336  18337  450 -18339 0
 18335 -18336  18337  450  18340 0

c  1-1 --> 0
c    (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0 ∧ -p_450) -> (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧ -b^{75, 7}_0)
c  in CNF:
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_2
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_1
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_0
c  in DIMACS:
 18335  18336 -18337  450 -18338 0
 18335  18336 -18337  450 -18339 0
 18335  18336 -18337  450 -18340 0

c  0-1 --> -1
c    (-b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧ -p_450) -> ( b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0)
c  in CNF:
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨  b^{75, 7}_2
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_1
c     b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨  b^{75, 7}_0
c  in DIMACS:
 18335  18336  18337  450  18338 0
 18335  18336  18337  450 -18339 0
 18335  18336  18337  450  18340 0

c  -1-1 --> -2
c    ( b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧  b^{75, 6}_0 ∧ -p_450) -> ( b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0)
c  in CNF:
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨  b^{75, 7}_2
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨  b^{75, 7}_1
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨  p_450 ∨ -b^{75, 7}_0
c  in DIMACS:
-18335  18336 -18337  450  18338 0
-18335  18336 -18337  450  18339 0
-18335  18336 -18337  450 -18340 0

c  -2-1 --> break 
c    ( b^{75, 6}_2 ∧  b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨  b^{75, 6}_0 ∨  p_450 ∨ break
c  in DIMACS:
-18335 -18336  18337  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 6}_2 ∧ -b^{75, 6}_1 ∧ -b^{75, 6}_0 ∧ true) 
c  in CNF:
c    -b^{75, 6}_2 ∨  b^{75, 6}_1 ∨  b^{75, 6}_0 ∨ false 
c  in DIMACS:
-18335  18336  18337  0

c  3 does not represent an automaton state.
c    -(-b^{75, 6}_2 ∧  b^{75, 6}_1 ∧  b^{75, 6}_0 ∧ true) 
c  in CNF:
c     b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ false 
c  in DIMACS:
 18335 -18336 -18337  0
c  -3 does not represent an automaton state.
c    -( b^{75, 6}_2 ∧  b^{75, 6}_1 ∧  b^{75, 6}_0 ∧ true) 
c  in CNF:
c    -b^{75, 6}_2 ∨ -b^{75, 6}_1 ∨ -b^{75, 6}_0 ∨ false 
c  in DIMACS:
-18335 -18336 -18337  0

c i = 7
c  -2+1 --> -1
c    ( b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧  p_525) -> ( b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0)
c  in CNF:
c    -b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨  b^{75, 8}_2
c    -b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_1
c    -b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨  b^{75, 8}_0
c  in DIMACS:
-18338 -18339  18340 -525  18341 0
-18338 -18339  18340 -525 -18342 0
-18338 -18339  18340 -525  18343 0

c  -1+1 --> 0
c    ( b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0 ∧  p_525) -> (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧ -b^{75, 8}_0)
c  in CNF:
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_2
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_1
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_0
c  in DIMACS:
-18338  18339 -18340 -525 -18341 0
-18338  18339 -18340 -525 -18342 0
-18338  18339 -18340 -525 -18343 0

c  0+1 --> 1
c    (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧  p_525) -> (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0)
c  in CNF:
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_2
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_1
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨  b^{75, 8}_0
c  in DIMACS:
 18338  18339  18340 -525 -18341 0
 18338  18339  18340 -525 -18342 0
 18338  18339  18340 -525  18343 0

c  1+1 --> 2
c    (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0 ∧  p_525) -> (-b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0)
c  in CNF:
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_2
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨  b^{75, 8}_1
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ -p_525 ∨ -b^{75, 8}_0
c  in DIMACS:
 18338  18339 -18340 -525 -18341 0
 18338  18339 -18340 -525  18342 0
 18338  18339 -18340 -525 -18343 0

c  2+1 --> break 
c    (-b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧  p_525) -> break
c  in CNF:
c     b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 18338 -18339  18340 -525 1162 0


c  2-1 --> 1
c    (-b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧ -p_525) -> (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0)
c  in CNF:
c     b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_2
c     b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_1
c     b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨  b^{75, 8}_0
c  in DIMACS:
 18338 -18339  18340  525 -18341 0
 18338 -18339  18340  525 -18342 0
 18338 -18339  18340  525  18343 0

c  1-1 --> 0
c    (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0 ∧ -p_525) -> (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧ -b^{75, 8}_0)
c  in CNF:
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_2
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_1
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_0
c  in DIMACS:
 18338  18339 -18340  525 -18341 0
 18338  18339 -18340  525 -18342 0
 18338  18339 -18340  525 -18343 0

c  0-1 --> -1
c    (-b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧ -p_525) -> ( b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0)
c  in CNF:
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨  b^{75, 8}_2
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_1
c     b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨  b^{75, 8}_0
c  in DIMACS:
 18338  18339  18340  525  18341 0
 18338  18339  18340  525 -18342 0
 18338  18339  18340  525  18343 0

c  -1-1 --> -2
c    ( b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧  b^{75, 7}_0 ∧ -p_525) -> ( b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0)
c  in CNF:
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨  b^{75, 8}_2
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨  b^{75, 8}_1
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨  p_525 ∨ -b^{75, 8}_0
c  in DIMACS:
-18338  18339 -18340  525  18341 0
-18338  18339 -18340  525  18342 0
-18338  18339 -18340  525 -18343 0

c  -2-1 --> break 
c    ( b^{75, 7}_2 ∧  b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨  b^{75, 7}_0 ∨  p_525 ∨ break
c  in DIMACS:
-18338 -18339  18340  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 7}_2 ∧ -b^{75, 7}_1 ∧ -b^{75, 7}_0 ∧ true) 
c  in CNF:
c    -b^{75, 7}_2 ∨  b^{75, 7}_1 ∨  b^{75, 7}_0 ∨ false 
c  in DIMACS:
-18338  18339  18340  0

c  3 does not represent an automaton state.
c    -(-b^{75, 7}_2 ∧  b^{75, 7}_1 ∧  b^{75, 7}_0 ∧ true) 
c  in CNF:
c     b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ false 
c  in DIMACS:
 18338 -18339 -18340  0
c  -3 does not represent an automaton state.
c    -( b^{75, 7}_2 ∧  b^{75, 7}_1 ∧  b^{75, 7}_0 ∧ true) 
c  in CNF:
c    -b^{75, 7}_2 ∨ -b^{75, 7}_1 ∨ -b^{75, 7}_0 ∨ false 
c  in DIMACS:
-18338 -18339 -18340  0

c i = 8
c  -2+1 --> -1
c    ( b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧  p_600) -> ( b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0)
c  in CNF:
c    -b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨  b^{75, 9}_2
c    -b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_1
c    -b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨  b^{75, 9}_0
c  in DIMACS:
-18341 -18342  18343 -600  18344 0
-18341 -18342  18343 -600 -18345 0
-18341 -18342  18343 -600  18346 0

c  -1+1 --> 0
c    ( b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0 ∧  p_600) -> (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧ -b^{75, 9}_0)
c  in CNF:
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_2
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_1
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_0
c  in DIMACS:
-18341  18342 -18343 -600 -18344 0
-18341  18342 -18343 -600 -18345 0
-18341  18342 -18343 -600 -18346 0

c  0+1 --> 1
c    (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧  p_600) -> (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0)
c  in CNF:
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_2
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_1
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨  b^{75, 9}_0
c  in DIMACS:
 18341  18342  18343 -600 -18344 0
 18341  18342  18343 -600 -18345 0
 18341  18342  18343 -600  18346 0

c  1+1 --> 2
c    (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0 ∧  p_600) -> (-b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0)
c  in CNF:
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_2
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨  b^{75, 9}_1
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ -p_600 ∨ -b^{75, 9}_0
c  in DIMACS:
 18341  18342 -18343 -600 -18344 0
 18341  18342 -18343 -600  18345 0
 18341  18342 -18343 -600 -18346 0

c  2+1 --> break 
c    (-b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧  p_600) -> break
c  in CNF:
c     b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 18341 -18342  18343 -600 1162 0


c  2-1 --> 1
c    (-b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧ -p_600) -> (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0)
c  in CNF:
c     b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_2
c     b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_1
c     b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨  b^{75, 9}_0
c  in DIMACS:
 18341 -18342  18343  600 -18344 0
 18341 -18342  18343  600 -18345 0
 18341 -18342  18343  600  18346 0

c  1-1 --> 0
c    (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0 ∧ -p_600) -> (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧ -b^{75, 9}_0)
c  in CNF:
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_2
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_1
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_0
c  in DIMACS:
 18341  18342 -18343  600 -18344 0
 18341  18342 -18343  600 -18345 0
 18341  18342 -18343  600 -18346 0

c  0-1 --> -1
c    (-b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧ -p_600) -> ( b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0)
c  in CNF:
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨  b^{75, 9}_2
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_1
c     b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨  b^{75, 9}_0
c  in DIMACS:
 18341  18342  18343  600  18344 0
 18341  18342  18343  600 -18345 0
 18341  18342  18343  600  18346 0

c  -1-1 --> -2
c    ( b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧  b^{75, 8}_0 ∧ -p_600) -> ( b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0)
c  in CNF:
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨  b^{75, 9}_2
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨  b^{75, 9}_1
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨  p_600 ∨ -b^{75, 9}_0
c  in DIMACS:
-18341  18342 -18343  600  18344 0
-18341  18342 -18343  600  18345 0
-18341  18342 -18343  600 -18346 0

c  -2-1 --> break 
c    ( b^{75, 8}_2 ∧  b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨  b^{75, 8}_0 ∨  p_600 ∨ break
c  in DIMACS:
-18341 -18342  18343  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 8}_2 ∧ -b^{75, 8}_1 ∧ -b^{75, 8}_0 ∧ true) 
c  in CNF:
c    -b^{75, 8}_2 ∨  b^{75, 8}_1 ∨  b^{75, 8}_0 ∨ false 
c  in DIMACS:
-18341  18342  18343  0

c  3 does not represent an automaton state.
c    -(-b^{75, 8}_2 ∧  b^{75, 8}_1 ∧  b^{75, 8}_0 ∧ true) 
c  in CNF:
c     b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ false 
c  in DIMACS:
 18341 -18342 -18343  0
c  -3 does not represent an automaton state.
c    -( b^{75, 8}_2 ∧  b^{75, 8}_1 ∧  b^{75, 8}_0 ∧ true) 
c  in CNF:
c    -b^{75, 8}_2 ∨ -b^{75, 8}_1 ∨ -b^{75, 8}_0 ∨ false 
c  in DIMACS:
-18341 -18342 -18343  0

c i = 9
c  -2+1 --> -1
c    ( b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧  p_675) -> ( b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0)
c  in CNF:
c    -b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨  b^{75, 10}_2
c    -b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_1
c    -b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨  b^{75, 10}_0
c  in DIMACS:
-18344 -18345  18346 -675  18347 0
-18344 -18345  18346 -675 -18348 0
-18344 -18345  18346 -675  18349 0

c  -1+1 --> 0
c    ( b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0 ∧  p_675) -> (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧ -b^{75, 10}_0)
c  in CNF:
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_2
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_1
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_0
c  in DIMACS:
-18344  18345 -18346 -675 -18347 0
-18344  18345 -18346 -675 -18348 0
-18344  18345 -18346 -675 -18349 0

c  0+1 --> 1
c    (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧  p_675) -> (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0)
c  in CNF:
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_2
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_1
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨  b^{75, 10}_0
c  in DIMACS:
 18344  18345  18346 -675 -18347 0
 18344  18345  18346 -675 -18348 0
 18344  18345  18346 -675  18349 0

c  1+1 --> 2
c    (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0 ∧  p_675) -> (-b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0)
c  in CNF:
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_2
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨  b^{75, 10}_1
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ -p_675 ∨ -b^{75, 10}_0
c  in DIMACS:
 18344  18345 -18346 -675 -18347 0
 18344  18345 -18346 -675  18348 0
 18344  18345 -18346 -675 -18349 0

c  2+1 --> break 
c    (-b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧  p_675) -> break
c  in CNF:
c     b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 18344 -18345  18346 -675 1162 0


c  2-1 --> 1
c    (-b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧ -p_675) -> (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0)
c  in CNF:
c     b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_2
c     b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_1
c     b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨  b^{75, 10}_0
c  in DIMACS:
 18344 -18345  18346  675 -18347 0
 18344 -18345  18346  675 -18348 0
 18344 -18345  18346  675  18349 0

c  1-1 --> 0
c    (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0 ∧ -p_675) -> (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧ -b^{75, 10}_0)
c  in CNF:
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_2
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_1
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_0
c  in DIMACS:
 18344  18345 -18346  675 -18347 0
 18344  18345 -18346  675 -18348 0
 18344  18345 -18346  675 -18349 0

c  0-1 --> -1
c    (-b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧ -p_675) -> ( b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0)
c  in CNF:
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨  b^{75, 10}_2
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_1
c     b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨  b^{75, 10}_0
c  in DIMACS:
 18344  18345  18346  675  18347 0
 18344  18345  18346  675 -18348 0
 18344  18345  18346  675  18349 0

c  -1-1 --> -2
c    ( b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧  b^{75, 9}_0 ∧ -p_675) -> ( b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0)
c  in CNF:
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨  b^{75, 10}_2
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨  b^{75, 10}_1
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨  p_675 ∨ -b^{75, 10}_0
c  in DIMACS:
-18344  18345 -18346  675  18347 0
-18344  18345 -18346  675  18348 0
-18344  18345 -18346  675 -18349 0

c  -2-1 --> break 
c    ( b^{75, 9}_2 ∧  b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨  b^{75, 9}_0 ∨  p_675 ∨ break
c  in DIMACS:
-18344 -18345  18346  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 9}_2 ∧ -b^{75, 9}_1 ∧ -b^{75, 9}_0 ∧ true) 
c  in CNF:
c    -b^{75, 9}_2 ∨  b^{75, 9}_1 ∨  b^{75, 9}_0 ∨ false 
c  in DIMACS:
-18344  18345  18346  0

c  3 does not represent an automaton state.
c    -(-b^{75, 9}_2 ∧  b^{75, 9}_1 ∧  b^{75, 9}_0 ∧ true) 
c  in CNF:
c     b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ false 
c  in DIMACS:
 18344 -18345 -18346  0
c  -3 does not represent an automaton state.
c    -( b^{75, 9}_2 ∧  b^{75, 9}_1 ∧  b^{75, 9}_0 ∧ true) 
c  in CNF:
c    -b^{75, 9}_2 ∨ -b^{75, 9}_1 ∨ -b^{75, 9}_0 ∨ false 
c  in DIMACS:
-18344 -18345 -18346  0

c i = 10
c  -2+1 --> -1
c    ( b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧  p_750) -> ( b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0)
c  in CNF:
c    -b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨  b^{75, 11}_2
c    -b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_1
c    -b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨  b^{75, 11}_0
c  in DIMACS:
-18347 -18348  18349 -750  18350 0
-18347 -18348  18349 -750 -18351 0
-18347 -18348  18349 -750  18352 0

c  -1+1 --> 0
c    ( b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0 ∧  p_750) -> (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧ -b^{75, 11}_0)
c  in CNF:
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_2
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_1
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_0
c  in DIMACS:
-18347  18348 -18349 -750 -18350 0
-18347  18348 -18349 -750 -18351 0
-18347  18348 -18349 -750 -18352 0

c  0+1 --> 1
c    (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧  p_750) -> (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0)
c  in CNF:
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_2
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_1
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨  b^{75, 11}_0
c  in DIMACS:
 18347  18348  18349 -750 -18350 0
 18347  18348  18349 -750 -18351 0
 18347  18348  18349 -750  18352 0

c  1+1 --> 2
c    (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0 ∧  p_750) -> (-b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0)
c  in CNF:
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_2
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨  b^{75, 11}_1
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ -p_750 ∨ -b^{75, 11}_0
c  in DIMACS:
 18347  18348 -18349 -750 -18350 0
 18347  18348 -18349 -750  18351 0
 18347  18348 -18349 -750 -18352 0

c  2+1 --> break 
c    (-b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧  p_750) -> break
c  in CNF:
c     b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 18347 -18348  18349 -750 1162 0


c  2-1 --> 1
c    (-b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧ -p_750) -> (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0)
c  in CNF:
c     b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_2
c     b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_1
c     b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨  b^{75, 11}_0
c  in DIMACS:
 18347 -18348  18349  750 -18350 0
 18347 -18348  18349  750 -18351 0
 18347 -18348  18349  750  18352 0

c  1-1 --> 0
c    (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0 ∧ -p_750) -> (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧ -b^{75, 11}_0)
c  in CNF:
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_2
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_1
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_0
c  in DIMACS:
 18347  18348 -18349  750 -18350 0
 18347  18348 -18349  750 -18351 0
 18347  18348 -18349  750 -18352 0

c  0-1 --> -1
c    (-b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧ -p_750) -> ( b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0)
c  in CNF:
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨  b^{75, 11}_2
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_1
c     b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨  b^{75, 11}_0
c  in DIMACS:
 18347  18348  18349  750  18350 0
 18347  18348  18349  750 -18351 0
 18347  18348  18349  750  18352 0

c  -1-1 --> -2
c    ( b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧  b^{75, 10}_0 ∧ -p_750) -> ( b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0)
c  in CNF:
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨  b^{75, 11}_2
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨  b^{75, 11}_1
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨  p_750 ∨ -b^{75, 11}_0
c  in DIMACS:
-18347  18348 -18349  750  18350 0
-18347  18348 -18349  750  18351 0
-18347  18348 -18349  750 -18352 0

c  -2-1 --> break 
c    ( b^{75, 10}_2 ∧  b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨  b^{75, 10}_0 ∨  p_750 ∨ break
c  in DIMACS:
-18347 -18348  18349  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 10}_2 ∧ -b^{75, 10}_1 ∧ -b^{75, 10}_0 ∧ true) 
c  in CNF:
c    -b^{75, 10}_2 ∨  b^{75, 10}_1 ∨  b^{75, 10}_0 ∨ false 
c  in DIMACS:
-18347  18348  18349  0

c  3 does not represent an automaton state.
c    -(-b^{75, 10}_2 ∧  b^{75, 10}_1 ∧  b^{75, 10}_0 ∧ true) 
c  in CNF:
c     b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ false 
c  in DIMACS:
 18347 -18348 -18349  0
c  -3 does not represent an automaton state.
c    -( b^{75, 10}_2 ∧  b^{75, 10}_1 ∧  b^{75, 10}_0 ∧ true) 
c  in CNF:
c    -b^{75, 10}_2 ∨ -b^{75, 10}_1 ∨ -b^{75, 10}_0 ∨ false 
c  in DIMACS:
-18347 -18348 -18349  0

c i = 11
c  -2+1 --> -1
c    ( b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧  p_825) -> ( b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0)
c  in CNF:
c    -b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨  b^{75, 12}_2
c    -b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_1
c    -b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨  b^{75, 12}_0
c  in DIMACS:
-18350 -18351  18352 -825  18353 0
-18350 -18351  18352 -825 -18354 0
-18350 -18351  18352 -825  18355 0

c  -1+1 --> 0
c    ( b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0 ∧  p_825) -> (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧ -b^{75, 12}_0)
c  in CNF:
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_2
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_1
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_0
c  in DIMACS:
-18350  18351 -18352 -825 -18353 0
-18350  18351 -18352 -825 -18354 0
-18350  18351 -18352 -825 -18355 0

c  0+1 --> 1
c    (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧  p_825) -> (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0)
c  in CNF:
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_2
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_1
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨  b^{75, 12}_0
c  in DIMACS:
 18350  18351  18352 -825 -18353 0
 18350  18351  18352 -825 -18354 0
 18350  18351  18352 -825  18355 0

c  1+1 --> 2
c    (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0 ∧  p_825) -> (-b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0)
c  in CNF:
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_2
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨  b^{75, 12}_1
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ -p_825 ∨ -b^{75, 12}_0
c  in DIMACS:
 18350  18351 -18352 -825 -18353 0
 18350  18351 -18352 -825  18354 0
 18350  18351 -18352 -825 -18355 0

c  2+1 --> break 
c    (-b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧  p_825) -> break
c  in CNF:
c     b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 18350 -18351  18352 -825 1162 0


c  2-1 --> 1
c    (-b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧ -p_825) -> (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0)
c  in CNF:
c     b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_2
c     b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_1
c     b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨  b^{75, 12}_0
c  in DIMACS:
 18350 -18351  18352  825 -18353 0
 18350 -18351  18352  825 -18354 0
 18350 -18351  18352  825  18355 0

c  1-1 --> 0
c    (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0 ∧ -p_825) -> (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧ -b^{75, 12}_0)
c  in CNF:
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_2
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_1
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_0
c  in DIMACS:
 18350  18351 -18352  825 -18353 0
 18350  18351 -18352  825 -18354 0
 18350  18351 -18352  825 -18355 0

c  0-1 --> -1
c    (-b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧ -p_825) -> ( b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0)
c  in CNF:
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨  b^{75, 12}_2
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_1
c     b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨  b^{75, 12}_0
c  in DIMACS:
 18350  18351  18352  825  18353 0
 18350  18351  18352  825 -18354 0
 18350  18351  18352  825  18355 0

c  -1-1 --> -2
c    ( b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧  b^{75, 11}_0 ∧ -p_825) -> ( b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0)
c  in CNF:
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨  b^{75, 12}_2
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨  b^{75, 12}_1
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨  p_825 ∨ -b^{75, 12}_0
c  in DIMACS:
-18350  18351 -18352  825  18353 0
-18350  18351 -18352  825  18354 0
-18350  18351 -18352  825 -18355 0

c  -2-1 --> break 
c    ( b^{75, 11}_2 ∧  b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨  b^{75, 11}_0 ∨  p_825 ∨ break
c  in DIMACS:
-18350 -18351  18352  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 11}_2 ∧ -b^{75, 11}_1 ∧ -b^{75, 11}_0 ∧ true) 
c  in CNF:
c    -b^{75, 11}_2 ∨  b^{75, 11}_1 ∨  b^{75, 11}_0 ∨ false 
c  in DIMACS:
-18350  18351  18352  0

c  3 does not represent an automaton state.
c    -(-b^{75, 11}_2 ∧  b^{75, 11}_1 ∧  b^{75, 11}_0 ∧ true) 
c  in CNF:
c     b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ false 
c  in DIMACS:
 18350 -18351 -18352  0
c  -3 does not represent an automaton state.
c    -( b^{75, 11}_2 ∧  b^{75, 11}_1 ∧  b^{75, 11}_0 ∧ true) 
c  in CNF:
c    -b^{75, 11}_2 ∨ -b^{75, 11}_1 ∨ -b^{75, 11}_0 ∨ false 
c  in DIMACS:
-18350 -18351 -18352  0

c i = 12
c  -2+1 --> -1
c    ( b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧  p_900) -> ( b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0)
c  in CNF:
c    -b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨  b^{75, 13}_2
c    -b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_1
c    -b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨  b^{75, 13}_0
c  in DIMACS:
-18353 -18354  18355 -900  18356 0
-18353 -18354  18355 -900 -18357 0
-18353 -18354  18355 -900  18358 0

c  -1+1 --> 0
c    ( b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0 ∧  p_900) -> (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧ -b^{75, 13}_0)
c  in CNF:
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_2
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_1
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_0
c  in DIMACS:
-18353  18354 -18355 -900 -18356 0
-18353  18354 -18355 -900 -18357 0
-18353  18354 -18355 -900 -18358 0

c  0+1 --> 1
c    (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧  p_900) -> (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0)
c  in CNF:
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_2
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_1
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨  b^{75, 13}_0
c  in DIMACS:
 18353  18354  18355 -900 -18356 0
 18353  18354  18355 -900 -18357 0
 18353  18354  18355 -900  18358 0

c  1+1 --> 2
c    (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0 ∧  p_900) -> (-b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0)
c  in CNF:
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_2
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨  b^{75, 13}_1
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ -p_900 ∨ -b^{75, 13}_0
c  in DIMACS:
 18353  18354 -18355 -900 -18356 0
 18353  18354 -18355 -900  18357 0
 18353  18354 -18355 -900 -18358 0

c  2+1 --> break 
c    (-b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧  p_900) -> break
c  in CNF:
c     b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 18353 -18354  18355 -900 1162 0


c  2-1 --> 1
c    (-b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧ -p_900) -> (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0)
c  in CNF:
c     b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_2
c     b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_1
c     b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨  b^{75, 13}_0
c  in DIMACS:
 18353 -18354  18355  900 -18356 0
 18353 -18354  18355  900 -18357 0
 18353 -18354  18355  900  18358 0

c  1-1 --> 0
c    (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0 ∧ -p_900) -> (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧ -b^{75, 13}_0)
c  in CNF:
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_2
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_1
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_0
c  in DIMACS:
 18353  18354 -18355  900 -18356 0
 18353  18354 -18355  900 -18357 0
 18353  18354 -18355  900 -18358 0

c  0-1 --> -1
c    (-b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧ -p_900) -> ( b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0)
c  in CNF:
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨  b^{75, 13}_2
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_1
c     b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨  b^{75, 13}_0
c  in DIMACS:
 18353  18354  18355  900  18356 0
 18353  18354  18355  900 -18357 0
 18353  18354  18355  900  18358 0

c  -1-1 --> -2
c    ( b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧  b^{75, 12}_0 ∧ -p_900) -> ( b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0)
c  in CNF:
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨  b^{75, 13}_2
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨  b^{75, 13}_1
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨  p_900 ∨ -b^{75, 13}_0
c  in DIMACS:
-18353  18354 -18355  900  18356 0
-18353  18354 -18355  900  18357 0
-18353  18354 -18355  900 -18358 0

c  -2-1 --> break 
c    ( b^{75, 12}_2 ∧  b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨  b^{75, 12}_0 ∨  p_900 ∨ break
c  in DIMACS:
-18353 -18354  18355  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 12}_2 ∧ -b^{75, 12}_1 ∧ -b^{75, 12}_0 ∧ true) 
c  in CNF:
c    -b^{75, 12}_2 ∨  b^{75, 12}_1 ∨  b^{75, 12}_0 ∨ false 
c  in DIMACS:
-18353  18354  18355  0

c  3 does not represent an automaton state.
c    -(-b^{75, 12}_2 ∧  b^{75, 12}_1 ∧  b^{75, 12}_0 ∧ true) 
c  in CNF:
c     b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ false 
c  in DIMACS:
 18353 -18354 -18355  0
c  -3 does not represent an automaton state.
c    -( b^{75, 12}_2 ∧  b^{75, 12}_1 ∧  b^{75, 12}_0 ∧ true) 
c  in CNF:
c    -b^{75, 12}_2 ∨ -b^{75, 12}_1 ∨ -b^{75, 12}_0 ∨ false 
c  in DIMACS:
-18353 -18354 -18355  0

c i = 13
c  -2+1 --> -1
c    ( b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧  p_975) -> ( b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0)
c  in CNF:
c    -b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨  b^{75, 14}_2
c    -b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_1
c    -b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨  b^{75, 14}_0
c  in DIMACS:
-18356 -18357  18358 -975  18359 0
-18356 -18357  18358 -975 -18360 0
-18356 -18357  18358 -975  18361 0

c  -1+1 --> 0
c    ( b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0 ∧  p_975) -> (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧ -b^{75, 14}_0)
c  in CNF:
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_2
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_1
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_0
c  in DIMACS:
-18356  18357 -18358 -975 -18359 0
-18356  18357 -18358 -975 -18360 0
-18356  18357 -18358 -975 -18361 0

c  0+1 --> 1
c    (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧  p_975) -> (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0)
c  in CNF:
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_2
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_1
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨  b^{75, 14}_0
c  in DIMACS:
 18356  18357  18358 -975 -18359 0
 18356  18357  18358 -975 -18360 0
 18356  18357  18358 -975  18361 0

c  1+1 --> 2
c    (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0 ∧  p_975) -> (-b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0)
c  in CNF:
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_2
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨  b^{75, 14}_1
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ -p_975 ∨ -b^{75, 14}_0
c  in DIMACS:
 18356  18357 -18358 -975 -18359 0
 18356  18357 -18358 -975  18360 0
 18356  18357 -18358 -975 -18361 0

c  2+1 --> break 
c    (-b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧  p_975) -> break
c  in CNF:
c     b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 18356 -18357  18358 -975 1162 0


c  2-1 --> 1
c    (-b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧ -p_975) -> (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0)
c  in CNF:
c     b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_2
c     b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_1
c     b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨  b^{75, 14}_0
c  in DIMACS:
 18356 -18357  18358  975 -18359 0
 18356 -18357  18358  975 -18360 0
 18356 -18357  18358  975  18361 0

c  1-1 --> 0
c    (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0 ∧ -p_975) -> (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧ -b^{75, 14}_0)
c  in CNF:
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_2
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_1
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_0
c  in DIMACS:
 18356  18357 -18358  975 -18359 0
 18356  18357 -18358  975 -18360 0
 18356  18357 -18358  975 -18361 0

c  0-1 --> -1
c    (-b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧ -p_975) -> ( b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0)
c  in CNF:
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨  b^{75, 14}_2
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_1
c     b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨  b^{75, 14}_0
c  in DIMACS:
 18356  18357  18358  975  18359 0
 18356  18357  18358  975 -18360 0
 18356  18357  18358  975  18361 0

c  -1-1 --> -2
c    ( b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧  b^{75, 13}_0 ∧ -p_975) -> ( b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0)
c  in CNF:
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨  b^{75, 14}_2
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨  b^{75, 14}_1
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨  p_975 ∨ -b^{75, 14}_0
c  in DIMACS:
-18356  18357 -18358  975  18359 0
-18356  18357 -18358  975  18360 0
-18356  18357 -18358  975 -18361 0

c  -2-1 --> break 
c    ( b^{75, 13}_2 ∧  b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨  b^{75, 13}_0 ∨  p_975 ∨ break
c  in DIMACS:
-18356 -18357  18358  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 13}_2 ∧ -b^{75, 13}_1 ∧ -b^{75, 13}_0 ∧ true) 
c  in CNF:
c    -b^{75, 13}_2 ∨  b^{75, 13}_1 ∨  b^{75, 13}_0 ∨ false 
c  in DIMACS:
-18356  18357  18358  0

c  3 does not represent an automaton state.
c    -(-b^{75, 13}_2 ∧  b^{75, 13}_1 ∧  b^{75, 13}_0 ∧ true) 
c  in CNF:
c     b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ false 
c  in DIMACS:
 18356 -18357 -18358  0
c  -3 does not represent an automaton state.
c    -( b^{75, 13}_2 ∧  b^{75, 13}_1 ∧  b^{75, 13}_0 ∧ true) 
c  in CNF:
c    -b^{75, 13}_2 ∨ -b^{75, 13}_1 ∨ -b^{75, 13}_0 ∨ false 
c  in DIMACS:
-18356 -18357 -18358  0

c i = 14
c  -2+1 --> -1
c    ( b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧  p_1050) -> ( b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0)
c  in CNF:
c    -b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨  b^{75, 15}_2
c    -b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_1
c    -b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨  b^{75, 15}_0
c  in DIMACS:
-18359 -18360  18361 -1050  18362 0
-18359 -18360  18361 -1050 -18363 0
-18359 -18360  18361 -1050  18364 0

c  -1+1 --> 0
c    ( b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0 ∧  p_1050) -> (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧ -b^{75, 15}_0)
c  in CNF:
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_2
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_1
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_0
c  in DIMACS:
-18359  18360 -18361 -1050 -18362 0
-18359  18360 -18361 -1050 -18363 0
-18359  18360 -18361 -1050 -18364 0

c  0+1 --> 1
c    (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧  p_1050) -> (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0)
c  in CNF:
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_2
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_1
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨  b^{75, 15}_0
c  in DIMACS:
 18359  18360  18361 -1050 -18362 0
 18359  18360  18361 -1050 -18363 0
 18359  18360  18361 -1050  18364 0

c  1+1 --> 2
c    (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0 ∧  p_1050) -> (-b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0)
c  in CNF:
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_2
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨  b^{75, 15}_1
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ -p_1050 ∨ -b^{75, 15}_0
c  in DIMACS:
 18359  18360 -18361 -1050 -18362 0
 18359  18360 -18361 -1050  18363 0
 18359  18360 -18361 -1050 -18364 0

c  2+1 --> break 
c    (-b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 18359 -18360  18361 -1050 1162 0


c  2-1 --> 1
c    (-b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧ -p_1050) -> (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0)
c  in CNF:
c     b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_2
c     b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_1
c     b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨  b^{75, 15}_0
c  in DIMACS:
 18359 -18360  18361  1050 -18362 0
 18359 -18360  18361  1050 -18363 0
 18359 -18360  18361  1050  18364 0

c  1-1 --> 0
c    (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0 ∧ -p_1050) -> (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧ -b^{75, 15}_0)
c  in CNF:
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_2
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_1
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_0
c  in DIMACS:
 18359  18360 -18361  1050 -18362 0
 18359  18360 -18361  1050 -18363 0
 18359  18360 -18361  1050 -18364 0

c  0-1 --> -1
c    (-b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧ -p_1050) -> ( b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0)
c  in CNF:
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨  b^{75, 15}_2
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_1
c     b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨  b^{75, 15}_0
c  in DIMACS:
 18359  18360  18361  1050  18362 0
 18359  18360  18361  1050 -18363 0
 18359  18360  18361  1050  18364 0

c  -1-1 --> -2
c    ( b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧  b^{75, 14}_0 ∧ -p_1050) -> ( b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0)
c  in CNF:
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨  b^{75, 15}_2
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨  b^{75, 15}_1
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨  p_1050 ∨ -b^{75, 15}_0
c  in DIMACS:
-18359  18360 -18361  1050  18362 0
-18359  18360 -18361  1050  18363 0
-18359  18360 -18361  1050 -18364 0

c  -2-1 --> break 
c    ( b^{75, 14}_2 ∧  b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨  b^{75, 14}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-18359 -18360  18361  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 14}_2 ∧ -b^{75, 14}_1 ∧ -b^{75, 14}_0 ∧ true) 
c  in CNF:
c    -b^{75, 14}_2 ∨  b^{75, 14}_1 ∨  b^{75, 14}_0 ∨ false 
c  in DIMACS:
-18359  18360  18361  0

c  3 does not represent an automaton state.
c    -(-b^{75, 14}_2 ∧  b^{75, 14}_1 ∧  b^{75, 14}_0 ∧ true) 
c  in CNF:
c     b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ false 
c  in DIMACS:
 18359 -18360 -18361  0
c  -3 does not represent an automaton state.
c    -( b^{75, 14}_2 ∧  b^{75, 14}_1 ∧  b^{75, 14}_0 ∧ true) 
c  in CNF:
c    -b^{75, 14}_2 ∨ -b^{75, 14}_1 ∨ -b^{75, 14}_0 ∨ false 
c  in DIMACS:
-18359 -18360 -18361  0

c i = 15
c  -2+1 --> -1
c    ( b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧  p_1125) -> ( b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧  b^{75, 16}_0)
c  in CNF:
c    -b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨  b^{75, 16}_2
c    -b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_1
c    -b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨  b^{75, 16}_0
c  in DIMACS:
-18362 -18363  18364 -1125  18365 0
-18362 -18363  18364 -1125 -18366 0
-18362 -18363  18364 -1125  18367 0

c  -1+1 --> 0
c    ( b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0 ∧  p_1125) -> (-b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧ -b^{75, 16}_0)
c  in CNF:
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_2
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_1
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_0
c  in DIMACS:
-18362  18363 -18364 -1125 -18365 0
-18362  18363 -18364 -1125 -18366 0
-18362  18363 -18364 -1125 -18367 0

c  0+1 --> 1
c    (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧  p_1125) -> (-b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧  b^{75, 16}_0)
c  in CNF:
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_2
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_1
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨  b^{75, 16}_0
c  in DIMACS:
 18362  18363  18364 -1125 -18365 0
 18362  18363  18364 -1125 -18366 0
 18362  18363  18364 -1125  18367 0

c  1+1 --> 2
c    (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0 ∧  p_1125) -> (-b^{75, 16}_2 ∧  b^{75, 16}_1 ∧ -b^{75, 16}_0)
c  in CNF:
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_2
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨  b^{75, 16}_1
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ -p_1125 ∨ -b^{75, 16}_0
c  in DIMACS:
 18362  18363 -18364 -1125 -18365 0
 18362  18363 -18364 -1125  18366 0
 18362  18363 -18364 -1125 -18367 0

c  2+1 --> break 
c    (-b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 18362 -18363  18364 -1125 1162 0


c  2-1 --> 1
c    (-b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧ -p_1125) -> (-b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧  b^{75, 16}_0)
c  in CNF:
c     b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_2
c     b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_1
c     b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨  b^{75, 16}_0
c  in DIMACS:
 18362 -18363  18364  1125 -18365 0
 18362 -18363  18364  1125 -18366 0
 18362 -18363  18364  1125  18367 0

c  1-1 --> 0
c    (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0 ∧ -p_1125) -> (-b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧ -b^{75, 16}_0)
c  in CNF:
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_2
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_1
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_0
c  in DIMACS:
 18362  18363 -18364  1125 -18365 0
 18362  18363 -18364  1125 -18366 0
 18362  18363 -18364  1125 -18367 0

c  0-1 --> -1
c    (-b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧ -p_1125) -> ( b^{75, 16}_2 ∧ -b^{75, 16}_1 ∧  b^{75, 16}_0)
c  in CNF:
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨  b^{75, 16}_2
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_1
c     b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨  b^{75, 16}_0
c  in DIMACS:
 18362  18363  18364  1125  18365 0
 18362  18363  18364  1125 -18366 0
 18362  18363  18364  1125  18367 0

c  -1-1 --> -2
c    ( b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧  b^{75, 15}_0 ∧ -p_1125) -> ( b^{75, 16}_2 ∧  b^{75, 16}_1 ∧ -b^{75, 16}_0)
c  in CNF:
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨  b^{75, 16}_2
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨  b^{75, 16}_1
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨  p_1125 ∨ -b^{75, 16}_0
c  in DIMACS:
-18362  18363 -18364  1125  18365 0
-18362  18363 -18364  1125  18366 0
-18362  18363 -18364  1125 -18367 0

c  -2-1 --> break 
c    ( b^{75, 15}_2 ∧  b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨  b^{75, 15}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-18362 -18363  18364  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{75, 15}_2 ∧ -b^{75, 15}_1 ∧ -b^{75, 15}_0 ∧ true) 
c  in CNF:
c    -b^{75, 15}_2 ∨  b^{75, 15}_1 ∨  b^{75, 15}_0 ∨ false 
c  in DIMACS:
-18362  18363  18364  0

c  3 does not represent an automaton state.
c    -(-b^{75, 15}_2 ∧  b^{75, 15}_1 ∧  b^{75, 15}_0 ∧ true) 
c  in CNF:
c     b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ false 
c  in DIMACS:
 18362 -18363 -18364  0
c  -3 does not represent an automaton state.
c    -( b^{75, 15}_2 ∧  b^{75, 15}_1 ∧  b^{75, 15}_0 ∧ true) 
c  in CNF:
c    -b^{75, 15}_2 ∨ -b^{75, 15}_1 ∨ -b^{75, 15}_0 ∨ false 
c  in DIMACS:
-18362 -18363 -18364  0

c INIT for k = 76
c    -b^{76, 1}_2
c    -b^{76, 1}_1
c    -b^{76, 1}_0
c  in DIMACS:
-18368 0
-18369 0
-18370 0

c Transitions for k = 76
c i = 1
c  -2+1 --> -1
c    ( b^{76, 1}_2 ∧  b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧  p_76) -> ( b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0)
c  in CNF:
c    -b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨  b^{76, 2}_2
c    -b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_1
c    -b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨  b^{76, 2}_0
c  in DIMACS:
-18368 -18369  18370 -76  18371 0
-18368 -18369  18370 -76 -18372 0
-18368 -18369  18370 -76  18373 0

c  -1+1 --> 0
c    ( b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧  b^{76, 1}_0 ∧  p_76) -> (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧ -b^{76, 2}_0)
c  in CNF:
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_2
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_1
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_0
c  in DIMACS:
-18368  18369 -18370 -76 -18371 0
-18368  18369 -18370 -76 -18372 0
-18368  18369 -18370 -76 -18373 0

c  0+1 --> 1
c    (-b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧  p_76) -> (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0)
c  in CNF:
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_2
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_1
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨  b^{76, 2}_0
c  in DIMACS:
 18368  18369  18370 -76 -18371 0
 18368  18369  18370 -76 -18372 0
 18368  18369  18370 -76  18373 0

c  1+1 --> 2
c    (-b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧  b^{76, 1}_0 ∧  p_76) -> (-b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0)
c  in CNF:
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_2
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨  b^{76, 2}_1
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ -p_76 ∨ -b^{76, 2}_0
c  in DIMACS:
 18368  18369 -18370 -76 -18371 0
 18368  18369 -18370 -76  18372 0
 18368  18369 -18370 -76 -18373 0

c  2+1 --> break 
c    (-b^{76, 1}_2 ∧  b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧  p_76) -> break
c  in CNF:
c     b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ -p_76 ∨ break
c  in DIMACS:
 18368 -18369  18370 -76 1162 0


c  2-1 --> 1
c    (-b^{76, 1}_2 ∧  b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧ -p_76) -> (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0)
c  in CNF:
c     b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_2
c     b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_1
c     b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨  b^{76, 2}_0
c  in DIMACS:
 18368 -18369  18370  76 -18371 0
 18368 -18369  18370  76 -18372 0
 18368 -18369  18370  76  18373 0

c  1-1 --> 0
c    (-b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧  b^{76, 1}_0 ∧ -p_76) -> (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧ -b^{76, 2}_0)
c  in CNF:
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_2
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_1
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_0
c  in DIMACS:
 18368  18369 -18370  76 -18371 0
 18368  18369 -18370  76 -18372 0
 18368  18369 -18370  76 -18373 0

c  0-1 --> -1
c    (-b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧ -p_76) -> ( b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0)
c  in CNF:
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨  b^{76, 2}_2
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_1
c     b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨  b^{76, 2}_0
c  in DIMACS:
 18368  18369  18370  76  18371 0
 18368  18369  18370  76 -18372 0
 18368  18369  18370  76  18373 0

c  -1-1 --> -2
c    ( b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧  b^{76, 1}_0 ∧ -p_76) -> ( b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0)
c  in CNF:
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨  b^{76, 2}_2
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨  b^{76, 2}_1
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨  p_76 ∨ -b^{76, 2}_0
c  in DIMACS:
-18368  18369 -18370  76  18371 0
-18368  18369 -18370  76  18372 0
-18368  18369 -18370  76 -18373 0

c  -2-1 --> break 
c    ( b^{76, 1}_2 ∧  b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧ -p_76) -> break
c  in CNF:
c    -b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨  b^{76, 1}_0 ∨  p_76 ∨ break
c  in DIMACS:
-18368 -18369  18370  76 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 1}_2 ∧ -b^{76, 1}_1 ∧ -b^{76, 1}_0 ∧ true) 
c  in CNF:
c    -b^{76, 1}_2 ∨  b^{76, 1}_1 ∨  b^{76, 1}_0 ∨ false 
c  in DIMACS:
-18368  18369  18370  0

c  3 does not represent an automaton state.
c    -(-b^{76, 1}_2 ∧  b^{76, 1}_1 ∧  b^{76, 1}_0 ∧ true) 
c  in CNF:
c     b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ false 
c  in DIMACS:
 18368 -18369 -18370  0
c  -3 does not represent an automaton state.
c    -( b^{76, 1}_2 ∧  b^{76, 1}_1 ∧  b^{76, 1}_0 ∧ true) 
c  in CNF:
c    -b^{76, 1}_2 ∨ -b^{76, 1}_1 ∨ -b^{76, 1}_0 ∨ false 
c  in DIMACS:
-18368 -18369 -18370  0

c i = 2
c  -2+1 --> -1
c    ( b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧  p_152) -> ( b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0)
c  in CNF:
c    -b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨  b^{76, 3}_2
c    -b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_1
c    -b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨  b^{76, 3}_0
c  in DIMACS:
-18371 -18372  18373 -152  18374 0
-18371 -18372  18373 -152 -18375 0
-18371 -18372  18373 -152  18376 0

c  -1+1 --> 0
c    ( b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0 ∧  p_152) -> (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧ -b^{76, 3}_0)
c  in CNF:
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_2
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_1
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_0
c  in DIMACS:
-18371  18372 -18373 -152 -18374 0
-18371  18372 -18373 -152 -18375 0
-18371  18372 -18373 -152 -18376 0

c  0+1 --> 1
c    (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧  p_152) -> (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0)
c  in CNF:
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_2
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_1
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨  b^{76, 3}_0
c  in DIMACS:
 18371  18372  18373 -152 -18374 0
 18371  18372  18373 -152 -18375 0
 18371  18372  18373 -152  18376 0

c  1+1 --> 2
c    (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0 ∧  p_152) -> (-b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0)
c  in CNF:
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_2
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨  b^{76, 3}_1
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ -p_152 ∨ -b^{76, 3}_0
c  in DIMACS:
 18371  18372 -18373 -152 -18374 0
 18371  18372 -18373 -152  18375 0
 18371  18372 -18373 -152 -18376 0

c  2+1 --> break 
c    (-b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧  p_152) -> break
c  in CNF:
c     b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 18371 -18372  18373 -152 1162 0


c  2-1 --> 1
c    (-b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧ -p_152) -> (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0)
c  in CNF:
c     b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_2
c     b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_1
c     b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨  b^{76, 3}_0
c  in DIMACS:
 18371 -18372  18373  152 -18374 0
 18371 -18372  18373  152 -18375 0
 18371 -18372  18373  152  18376 0

c  1-1 --> 0
c    (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0 ∧ -p_152) -> (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧ -b^{76, 3}_0)
c  in CNF:
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_2
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_1
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_0
c  in DIMACS:
 18371  18372 -18373  152 -18374 0
 18371  18372 -18373  152 -18375 0
 18371  18372 -18373  152 -18376 0

c  0-1 --> -1
c    (-b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧ -p_152) -> ( b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0)
c  in CNF:
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨  b^{76, 3}_2
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_1
c     b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨  b^{76, 3}_0
c  in DIMACS:
 18371  18372  18373  152  18374 0
 18371  18372  18373  152 -18375 0
 18371  18372  18373  152  18376 0

c  -1-1 --> -2
c    ( b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧  b^{76, 2}_0 ∧ -p_152) -> ( b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0)
c  in CNF:
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨  b^{76, 3}_2
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨  b^{76, 3}_1
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨  p_152 ∨ -b^{76, 3}_0
c  in DIMACS:
-18371  18372 -18373  152  18374 0
-18371  18372 -18373  152  18375 0
-18371  18372 -18373  152 -18376 0

c  -2-1 --> break 
c    ( b^{76, 2}_2 ∧  b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨  b^{76, 2}_0 ∨  p_152 ∨ break
c  in DIMACS:
-18371 -18372  18373  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 2}_2 ∧ -b^{76, 2}_1 ∧ -b^{76, 2}_0 ∧ true) 
c  in CNF:
c    -b^{76, 2}_2 ∨  b^{76, 2}_1 ∨  b^{76, 2}_0 ∨ false 
c  in DIMACS:
-18371  18372  18373  0

c  3 does not represent an automaton state.
c    -(-b^{76, 2}_2 ∧  b^{76, 2}_1 ∧  b^{76, 2}_0 ∧ true) 
c  in CNF:
c     b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ false 
c  in DIMACS:
 18371 -18372 -18373  0
c  -3 does not represent an automaton state.
c    -( b^{76, 2}_2 ∧  b^{76, 2}_1 ∧  b^{76, 2}_0 ∧ true) 
c  in CNF:
c    -b^{76, 2}_2 ∨ -b^{76, 2}_1 ∨ -b^{76, 2}_0 ∨ false 
c  in DIMACS:
-18371 -18372 -18373  0

c i = 3
c  -2+1 --> -1
c    ( b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧  p_228) -> ( b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0)
c  in CNF:
c    -b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨  b^{76, 4}_2
c    -b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_1
c    -b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨  b^{76, 4}_0
c  in DIMACS:
-18374 -18375  18376 -228  18377 0
-18374 -18375  18376 -228 -18378 0
-18374 -18375  18376 -228  18379 0

c  -1+1 --> 0
c    ( b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0 ∧  p_228) -> (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧ -b^{76, 4}_0)
c  in CNF:
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_2
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_1
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_0
c  in DIMACS:
-18374  18375 -18376 -228 -18377 0
-18374  18375 -18376 -228 -18378 0
-18374  18375 -18376 -228 -18379 0

c  0+1 --> 1
c    (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧  p_228) -> (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0)
c  in CNF:
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_2
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_1
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨  b^{76, 4}_0
c  in DIMACS:
 18374  18375  18376 -228 -18377 0
 18374  18375  18376 -228 -18378 0
 18374  18375  18376 -228  18379 0

c  1+1 --> 2
c    (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0 ∧  p_228) -> (-b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0)
c  in CNF:
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_2
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨  b^{76, 4}_1
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ -p_228 ∨ -b^{76, 4}_0
c  in DIMACS:
 18374  18375 -18376 -228 -18377 0
 18374  18375 -18376 -228  18378 0
 18374  18375 -18376 -228 -18379 0

c  2+1 --> break 
c    (-b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧  p_228) -> break
c  in CNF:
c     b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 18374 -18375  18376 -228 1162 0


c  2-1 --> 1
c    (-b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧ -p_228) -> (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0)
c  in CNF:
c     b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_2
c     b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_1
c     b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨  b^{76, 4}_0
c  in DIMACS:
 18374 -18375  18376  228 -18377 0
 18374 -18375  18376  228 -18378 0
 18374 -18375  18376  228  18379 0

c  1-1 --> 0
c    (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0 ∧ -p_228) -> (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧ -b^{76, 4}_0)
c  in CNF:
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_2
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_1
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_0
c  in DIMACS:
 18374  18375 -18376  228 -18377 0
 18374  18375 -18376  228 -18378 0
 18374  18375 -18376  228 -18379 0

c  0-1 --> -1
c    (-b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧ -p_228) -> ( b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0)
c  in CNF:
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨  b^{76, 4}_2
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_1
c     b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨  b^{76, 4}_0
c  in DIMACS:
 18374  18375  18376  228  18377 0
 18374  18375  18376  228 -18378 0
 18374  18375  18376  228  18379 0

c  -1-1 --> -2
c    ( b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧  b^{76, 3}_0 ∧ -p_228) -> ( b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0)
c  in CNF:
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨  b^{76, 4}_2
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨  b^{76, 4}_1
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨  p_228 ∨ -b^{76, 4}_0
c  in DIMACS:
-18374  18375 -18376  228  18377 0
-18374  18375 -18376  228  18378 0
-18374  18375 -18376  228 -18379 0

c  -2-1 --> break 
c    ( b^{76, 3}_2 ∧  b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨  b^{76, 3}_0 ∨  p_228 ∨ break
c  in DIMACS:
-18374 -18375  18376  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 3}_2 ∧ -b^{76, 3}_1 ∧ -b^{76, 3}_0 ∧ true) 
c  in CNF:
c    -b^{76, 3}_2 ∨  b^{76, 3}_1 ∨  b^{76, 3}_0 ∨ false 
c  in DIMACS:
-18374  18375  18376  0

c  3 does not represent an automaton state.
c    -(-b^{76, 3}_2 ∧  b^{76, 3}_1 ∧  b^{76, 3}_0 ∧ true) 
c  in CNF:
c     b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ false 
c  in DIMACS:
 18374 -18375 -18376  0
c  -3 does not represent an automaton state.
c    -( b^{76, 3}_2 ∧  b^{76, 3}_1 ∧  b^{76, 3}_0 ∧ true) 
c  in CNF:
c    -b^{76, 3}_2 ∨ -b^{76, 3}_1 ∨ -b^{76, 3}_0 ∨ false 
c  in DIMACS:
-18374 -18375 -18376  0

c i = 4
c  -2+1 --> -1
c    ( b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧  p_304) -> ( b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0)
c  in CNF:
c    -b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨  b^{76, 5}_2
c    -b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_1
c    -b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨  b^{76, 5}_0
c  in DIMACS:
-18377 -18378  18379 -304  18380 0
-18377 -18378  18379 -304 -18381 0
-18377 -18378  18379 -304  18382 0

c  -1+1 --> 0
c    ( b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0 ∧  p_304) -> (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧ -b^{76, 5}_0)
c  in CNF:
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_2
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_1
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_0
c  in DIMACS:
-18377  18378 -18379 -304 -18380 0
-18377  18378 -18379 -304 -18381 0
-18377  18378 -18379 -304 -18382 0

c  0+1 --> 1
c    (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧  p_304) -> (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0)
c  in CNF:
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_2
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_1
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨  b^{76, 5}_0
c  in DIMACS:
 18377  18378  18379 -304 -18380 0
 18377  18378  18379 -304 -18381 0
 18377  18378  18379 -304  18382 0

c  1+1 --> 2
c    (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0 ∧  p_304) -> (-b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0)
c  in CNF:
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_2
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨  b^{76, 5}_1
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ -p_304 ∨ -b^{76, 5}_0
c  in DIMACS:
 18377  18378 -18379 -304 -18380 0
 18377  18378 -18379 -304  18381 0
 18377  18378 -18379 -304 -18382 0

c  2+1 --> break 
c    (-b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧  p_304) -> break
c  in CNF:
c     b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 18377 -18378  18379 -304 1162 0


c  2-1 --> 1
c    (-b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧ -p_304) -> (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0)
c  in CNF:
c     b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_2
c     b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_1
c     b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨  b^{76, 5}_0
c  in DIMACS:
 18377 -18378  18379  304 -18380 0
 18377 -18378  18379  304 -18381 0
 18377 -18378  18379  304  18382 0

c  1-1 --> 0
c    (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0 ∧ -p_304) -> (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧ -b^{76, 5}_0)
c  in CNF:
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_2
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_1
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_0
c  in DIMACS:
 18377  18378 -18379  304 -18380 0
 18377  18378 -18379  304 -18381 0
 18377  18378 -18379  304 -18382 0

c  0-1 --> -1
c    (-b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧ -p_304) -> ( b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0)
c  in CNF:
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨  b^{76, 5}_2
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_1
c     b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨  b^{76, 5}_0
c  in DIMACS:
 18377  18378  18379  304  18380 0
 18377  18378  18379  304 -18381 0
 18377  18378  18379  304  18382 0

c  -1-1 --> -2
c    ( b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧  b^{76, 4}_0 ∧ -p_304) -> ( b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0)
c  in CNF:
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨  b^{76, 5}_2
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨  b^{76, 5}_1
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨  p_304 ∨ -b^{76, 5}_0
c  in DIMACS:
-18377  18378 -18379  304  18380 0
-18377  18378 -18379  304  18381 0
-18377  18378 -18379  304 -18382 0

c  -2-1 --> break 
c    ( b^{76, 4}_2 ∧  b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨  b^{76, 4}_0 ∨  p_304 ∨ break
c  in DIMACS:
-18377 -18378  18379  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 4}_2 ∧ -b^{76, 4}_1 ∧ -b^{76, 4}_0 ∧ true) 
c  in CNF:
c    -b^{76, 4}_2 ∨  b^{76, 4}_1 ∨  b^{76, 4}_0 ∨ false 
c  in DIMACS:
-18377  18378  18379  0

c  3 does not represent an automaton state.
c    -(-b^{76, 4}_2 ∧  b^{76, 4}_1 ∧  b^{76, 4}_0 ∧ true) 
c  in CNF:
c     b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ false 
c  in DIMACS:
 18377 -18378 -18379  0
c  -3 does not represent an automaton state.
c    -( b^{76, 4}_2 ∧  b^{76, 4}_1 ∧  b^{76, 4}_0 ∧ true) 
c  in CNF:
c    -b^{76, 4}_2 ∨ -b^{76, 4}_1 ∨ -b^{76, 4}_0 ∨ false 
c  in DIMACS:
-18377 -18378 -18379  0

c i = 5
c  -2+1 --> -1
c    ( b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧  p_380) -> ( b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0)
c  in CNF:
c    -b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨  b^{76, 6}_2
c    -b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_1
c    -b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨  b^{76, 6}_0
c  in DIMACS:
-18380 -18381  18382 -380  18383 0
-18380 -18381  18382 -380 -18384 0
-18380 -18381  18382 -380  18385 0

c  -1+1 --> 0
c    ( b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0 ∧  p_380) -> (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧ -b^{76, 6}_0)
c  in CNF:
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_2
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_1
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_0
c  in DIMACS:
-18380  18381 -18382 -380 -18383 0
-18380  18381 -18382 -380 -18384 0
-18380  18381 -18382 -380 -18385 0

c  0+1 --> 1
c    (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧  p_380) -> (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0)
c  in CNF:
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_2
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_1
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨  b^{76, 6}_0
c  in DIMACS:
 18380  18381  18382 -380 -18383 0
 18380  18381  18382 -380 -18384 0
 18380  18381  18382 -380  18385 0

c  1+1 --> 2
c    (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0 ∧  p_380) -> (-b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0)
c  in CNF:
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_2
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨  b^{76, 6}_1
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ -p_380 ∨ -b^{76, 6}_0
c  in DIMACS:
 18380  18381 -18382 -380 -18383 0
 18380  18381 -18382 -380  18384 0
 18380  18381 -18382 -380 -18385 0

c  2+1 --> break 
c    (-b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧  p_380) -> break
c  in CNF:
c     b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 18380 -18381  18382 -380 1162 0


c  2-1 --> 1
c    (-b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧ -p_380) -> (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0)
c  in CNF:
c     b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_2
c     b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_1
c     b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨  b^{76, 6}_0
c  in DIMACS:
 18380 -18381  18382  380 -18383 0
 18380 -18381  18382  380 -18384 0
 18380 -18381  18382  380  18385 0

c  1-1 --> 0
c    (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0 ∧ -p_380) -> (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧ -b^{76, 6}_0)
c  in CNF:
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_2
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_1
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_0
c  in DIMACS:
 18380  18381 -18382  380 -18383 0
 18380  18381 -18382  380 -18384 0
 18380  18381 -18382  380 -18385 0

c  0-1 --> -1
c    (-b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧ -p_380) -> ( b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0)
c  in CNF:
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨  b^{76, 6}_2
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_1
c     b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨  b^{76, 6}_0
c  in DIMACS:
 18380  18381  18382  380  18383 0
 18380  18381  18382  380 -18384 0
 18380  18381  18382  380  18385 0

c  -1-1 --> -2
c    ( b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧  b^{76, 5}_0 ∧ -p_380) -> ( b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0)
c  in CNF:
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨  b^{76, 6}_2
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨  b^{76, 6}_1
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨  p_380 ∨ -b^{76, 6}_0
c  in DIMACS:
-18380  18381 -18382  380  18383 0
-18380  18381 -18382  380  18384 0
-18380  18381 -18382  380 -18385 0

c  -2-1 --> break 
c    ( b^{76, 5}_2 ∧  b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨  b^{76, 5}_0 ∨  p_380 ∨ break
c  in DIMACS:
-18380 -18381  18382  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 5}_2 ∧ -b^{76, 5}_1 ∧ -b^{76, 5}_0 ∧ true) 
c  in CNF:
c    -b^{76, 5}_2 ∨  b^{76, 5}_1 ∨  b^{76, 5}_0 ∨ false 
c  in DIMACS:
-18380  18381  18382  0

c  3 does not represent an automaton state.
c    -(-b^{76, 5}_2 ∧  b^{76, 5}_1 ∧  b^{76, 5}_0 ∧ true) 
c  in CNF:
c     b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ false 
c  in DIMACS:
 18380 -18381 -18382  0
c  -3 does not represent an automaton state.
c    -( b^{76, 5}_2 ∧  b^{76, 5}_1 ∧  b^{76, 5}_0 ∧ true) 
c  in CNF:
c    -b^{76, 5}_2 ∨ -b^{76, 5}_1 ∨ -b^{76, 5}_0 ∨ false 
c  in DIMACS:
-18380 -18381 -18382  0

c i = 6
c  -2+1 --> -1
c    ( b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧  p_456) -> ( b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0)
c  in CNF:
c    -b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨  b^{76, 7}_2
c    -b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_1
c    -b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨  b^{76, 7}_0
c  in DIMACS:
-18383 -18384  18385 -456  18386 0
-18383 -18384  18385 -456 -18387 0
-18383 -18384  18385 -456  18388 0

c  -1+1 --> 0
c    ( b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0 ∧  p_456) -> (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧ -b^{76, 7}_0)
c  in CNF:
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_2
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_1
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_0
c  in DIMACS:
-18383  18384 -18385 -456 -18386 0
-18383  18384 -18385 -456 -18387 0
-18383  18384 -18385 -456 -18388 0

c  0+1 --> 1
c    (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧  p_456) -> (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0)
c  in CNF:
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_2
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_1
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨  b^{76, 7}_0
c  in DIMACS:
 18383  18384  18385 -456 -18386 0
 18383  18384  18385 -456 -18387 0
 18383  18384  18385 -456  18388 0

c  1+1 --> 2
c    (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0 ∧  p_456) -> (-b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0)
c  in CNF:
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_2
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨  b^{76, 7}_1
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ -p_456 ∨ -b^{76, 7}_0
c  in DIMACS:
 18383  18384 -18385 -456 -18386 0
 18383  18384 -18385 -456  18387 0
 18383  18384 -18385 -456 -18388 0

c  2+1 --> break 
c    (-b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧  p_456) -> break
c  in CNF:
c     b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 18383 -18384  18385 -456 1162 0


c  2-1 --> 1
c    (-b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧ -p_456) -> (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0)
c  in CNF:
c     b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_2
c     b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_1
c     b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨  b^{76, 7}_0
c  in DIMACS:
 18383 -18384  18385  456 -18386 0
 18383 -18384  18385  456 -18387 0
 18383 -18384  18385  456  18388 0

c  1-1 --> 0
c    (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0 ∧ -p_456) -> (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧ -b^{76, 7}_0)
c  in CNF:
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_2
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_1
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_0
c  in DIMACS:
 18383  18384 -18385  456 -18386 0
 18383  18384 -18385  456 -18387 0
 18383  18384 -18385  456 -18388 0

c  0-1 --> -1
c    (-b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧ -p_456) -> ( b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0)
c  in CNF:
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨  b^{76, 7}_2
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_1
c     b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨  b^{76, 7}_0
c  in DIMACS:
 18383  18384  18385  456  18386 0
 18383  18384  18385  456 -18387 0
 18383  18384  18385  456  18388 0

c  -1-1 --> -2
c    ( b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧  b^{76, 6}_0 ∧ -p_456) -> ( b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0)
c  in CNF:
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨  b^{76, 7}_2
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨  b^{76, 7}_1
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨  p_456 ∨ -b^{76, 7}_0
c  in DIMACS:
-18383  18384 -18385  456  18386 0
-18383  18384 -18385  456  18387 0
-18383  18384 -18385  456 -18388 0

c  -2-1 --> break 
c    ( b^{76, 6}_2 ∧  b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨  b^{76, 6}_0 ∨  p_456 ∨ break
c  in DIMACS:
-18383 -18384  18385  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 6}_2 ∧ -b^{76, 6}_1 ∧ -b^{76, 6}_0 ∧ true) 
c  in CNF:
c    -b^{76, 6}_2 ∨  b^{76, 6}_1 ∨  b^{76, 6}_0 ∨ false 
c  in DIMACS:
-18383  18384  18385  0

c  3 does not represent an automaton state.
c    -(-b^{76, 6}_2 ∧  b^{76, 6}_1 ∧  b^{76, 6}_0 ∧ true) 
c  in CNF:
c     b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ false 
c  in DIMACS:
 18383 -18384 -18385  0
c  -3 does not represent an automaton state.
c    -( b^{76, 6}_2 ∧  b^{76, 6}_1 ∧  b^{76, 6}_0 ∧ true) 
c  in CNF:
c    -b^{76, 6}_2 ∨ -b^{76, 6}_1 ∨ -b^{76, 6}_0 ∨ false 
c  in DIMACS:
-18383 -18384 -18385  0

c i = 7
c  -2+1 --> -1
c    ( b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧  p_532) -> ( b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0)
c  in CNF:
c    -b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨  b^{76, 8}_2
c    -b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_1
c    -b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨  b^{76, 8}_0
c  in DIMACS:
-18386 -18387  18388 -532  18389 0
-18386 -18387  18388 -532 -18390 0
-18386 -18387  18388 -532  18391 0

c  -1+1 --> 0
c    ( b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0 ∧  p_532) -> (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧ -b^{76, 8}_0)
c  in CNF:
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_2
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_1
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_0
c  in DIMACS:
-18386  18387 -18388 -532 -18389 0
-18386  18387 -18388 -532 -18390 0
-18386  18387 -18388 -532 -18391 0

c  0+1 --> 1
c    (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧  p_532) -> (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0)
c  in CNF:
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_2
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_1
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨  b^{76, 8}_0
c  in DIMACS:
 18386  18387  18388 -532 -18389 0
 18386  18387  18388 -532 -18390 0
 18386  18387  18388 -532  18391 0

c  1+1 --> 2
c    (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0 ∧  p_532) -> (-b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0)
c  in CNF:
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_2
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨  b^{76, 8}_1
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ -p_532 ∨ -b^{76, 8}_0
c  in DIMACS:
 18386  18387 -18388 -532 -18389 0
 18386  18387 -18388 -532  18390 0
 18386  18387 -18388 -532 -18391 0

c  2+1 --> break 
c    (-b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧  p_532) -> break
c  in CNF:
c     b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 18386 -18387  18388 -532 1162 0


c  2-1 --> 1
c    (-b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧ -p_532) -> (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0)
c  in CNF:
c     b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_2
c     b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_1
c     b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨  b^{76, 8}_0
c  in DIMACS:
 18386 -18387  18388  532 -18389 0
 18386 -18387  18388  532 -18390 0
 18386 -18387  18388  532  18391 0

c  1-1 --> 0
c    (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0 ∧ -p_532) -> (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧ -b^{76, 8}_0)
c  in CNF:
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_2
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_1
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_0
c  in DIMACS:
 18386  18387 -18388  532 -18389 0
 18386  18387 -18388  532 -18390 0
 18386  18387 -18388  532 -18391 0

c  0-1 --> -1
c    (-b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧ -p_532) -> ( b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0)
c  in CNF:
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨  b^{76, 8}_2
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_1
c     b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨  b^{76, 8}_0
c  in DIMACS:
 18386  18387  18388  532  18389 0
 18386  18387  18388  532 -18390 0
 18386  18387  18388  532  18391 0

c  -1-1 --> -2
c    ( b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧  b^{76, 7}_0 ∧ -p_532) -> ( b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0)
c  in CNF:
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨  b^{76, 8}_2
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨  b^{76, 8}_1
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨  p_532 ∨ -b^{76, 8}_0
c  in DIMACS:
-18386  18387 -18388  532  18389 0
-18386  18387 -18388  532  18390 0
-18386  18387 -18388  532 -18391 0

c  -2-1 --> break 
c    ( b^{76, 7}_2 ∧  b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨  b^{76, 7}_0 ∨  p_532 ∨ break
c  in DIMACS:
-18386 -18387  18388  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 7}_2 ∧ -b^{76, 7}_1 ∧ -b^{76, 7}_0 ∧ true) 
c  in CNF:
c    -b^{76, 7}_2 ∨  b^{76, 7}_1 ∨  b^{76, 7}_0 ∨ false 
c  in DIMACS:
-18386  18387  18388  0

c  3 does not represent an automaton state.
c    -(-b^{76, 7}_2 ∧  b^{76, 7}_1 ∧  b^{76, 7}_0 ∧ true) 
c  in CNF:
c     b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ false 
c  in DIMACS:
 18386 -18387 -18388  0
c  -3 does not represent an automaton state.
c    -( b^{76, 7}_2 ∧  b^{76, 7}_1 ∧  b^{76, 7}_0 ∧ true) 
c  in CNF:
c    -b^{76, 7}_2 ∨ -b^{76, 7}_1 ∨ -b^{76, 7}_0 ∨ false 
c  in DIMACS:
-18386 -18387 -18388  0

c i = 8
c  -2+1 --> -1
c    ( b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧  p_608) -> ( b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0)
c  in CNF:
c    -b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨  b^{76, 9}_2
c    -b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_1
c    -b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨  b^{76, 9}_0
c  in DIMACS:
-18389 -18390  18391 -608  18392 0
-18389 -18390  18391 -608 -18393 0
-18389 -18390  18391 -608  18394 0

c  -1+1 --> 0
c    ( b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0 ∧  p_608) -> (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧ -b^{76, 9}_0)
c  in CNF:
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_2
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_1
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_0
c  in DIMACS:
-18389  18390 -18391 -608 -18392 0
-18389  18390 -18391 -608 -18393 0
-18389  18390 -18391 -608 -18394 0

c  0+1 --> 1
c    (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧  p_608) -> (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0)
c  in CNF:
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_2
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_1
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨  b^{76, 9}_0
c  in DIMACS:
 18389  18390  18391 -608 -18392 0
 18389  18390  18391 -608 -18393 0
 18389  18390  18391 -608  18394 0

c  1+1 --> 2
c    (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0 ∧  p_608) -> (-b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0)
c  in CNF:
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_2
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨  b^{76, 9}_1
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ -p_608 ∨ -b^{76, 9}_0
c  in DIMACS:
 18389  18390 -18391 -608 -18392 0
 18389  18390 -18391 -608  18393 0
 18389  18390 -18391 -608 -18394 0

c  2+1 --> break 
c    (-b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧  p_608) -> break
c  in CNF:
c     b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 18389 -18390  18391 -608 1162 0


c  2-1 --> 1
c    (-b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧ -p_608) -> (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0)
c  in CNF:
c     b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_2
c     b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_1
c     b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨  b^{76, 9}_0
c  in DIMACS:
 18389 -18390  18391  608 -18392 0
 18389 -18390  18391  608 -18393 0
 18389 -18390  18391  608  18394 0

c  1-1 --> 0
c    (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0 ∧ -p_608) -> (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧ -b^{76, 9}_0)
c  in CNF:
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_2
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_1
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_0
c  in DIMACS:
 18389  18390 -18391  608 -18392 0
 18389  18390 -18391  608 -18393 0
 18389  18390 -18391  608 -18394 0

c  0-1 --> -1
c    (-b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧ -p_608) -> ( b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0)
c  in CNF:
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨  b^{76, 9}_2
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_1
c     b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨  b^{76, 9}_0
c  in DIMACS:
 18389  18390  18391  608  18392 0
 18389  18390  18391  608 -18393 0
 18389  18390  18391  608  18394 0

c  -1-1 --> -2
c    ( b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧  b^{76, 8}_0 ∧ -p_608) -> ( b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0)
c  in CNF:
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨  b^{76, 9}_2
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨  b^{76, 9}_1
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨  p_608 ∨ -b^{76, 9}_0
c  in DIMACS:
-18389  18390 -18391  608  18392 0
-18389  18390 -18391  608  18393 0
-18389  18390 -18391  608 -18394 0

c  -2-1 --> break 
c    ( b^{76, 8}_2 ∧  b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨  b^{76, 8}_0 ∨  p_608 ∨ break
c  in DIMACS:
-18389 -18390  18391  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 8}_2 ∧ -b^{76, 8}_1 ∧ -b^{76, 8}_0 ∧ true) 
c  in CNF:
c    -b^{76, 8}_2 ∨  b^{76, 8}_1 ∨  b^{76, 8}_0 ∨ false 
c  in DIMACS:
-18389  18390  18391  0

c  3 does not represent an automaton state.
c    -(-b^{76, 8}_2 ∧  b^{76, 8}_1 ∧  b^{76, 8}_0 ∧ true) 
c  in CNF:
c     b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ false 
c  in DIMACS:
 18389 -18390 -18391  0
c  -3 does not represent an automaton state.
c    -( b^{76, 8}_2 ∧  b^{76, 8}_1 ∧  b^{76, 8}_0 ∧ true) 
c  in CNF:
c    -b^{76, 8}_2 ∨ -b^{76, 8}_1 ∨ -b^{76, 8}_0 ∨ false 
c  in DIMACS:
-18389 -18390 -18391  0

c i = 9
c  -2+1 --> -1
c    ( b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧  p_684) -> ( b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0)
c  in CNF:
c    -b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨  b^{76, 10}_2
c    -b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_1
c    -b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨  b^{76, 10}_0
c  in DIMACS:
-18392 -18393  18394 -684  18395 0
-18392 -18393  18394 -684 -18396 0
-18392 -18393  18394 -684  18397 0

c  -1+1 --> 0
c    ( b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0 ∧  p_684) -> (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧ -b^{76, 10}_0)
c  in CNF:
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_2
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_1
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_0
c  in DIMACS:
-18392  18393 -18394 -684 -18395 0
-18392  18393 -18394 -684 -18396 0
-18392  18393 -18394 -684 -18397 0

c  0+1 --> 1
c    (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧  p_684) -> (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0)
c  in CNF:
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_2
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_1
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨  b^{76, 10}_0
c  in DIMACS:
 18392  18393  18394 -684 -18395 0
 18392  18393  18394 -684 -18396 0
 18392  18393  18394 -684  18397 0

c  1+1 --> 2
c    (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0 ∧  p_684) -> (-b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0)
c  in CNF:
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_2
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨  b^{76, 10}_1
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ -p_684 ∨ -b^{76, 10}_0
c  in DIMACS:
 18392  18393 -18394 -684 -18395 0
 18392  18393 -18394 -684  18396 0
 18392  18393 -18394 -684 -18397 0

c  2+1 --> break 
c    (-b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧  p_684) -> break
c  in CNF:
c     b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 18392 -18393  18394 -684 1162 0


c  2-1 --> 1
c    (-b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧ -p_684) -> (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0)
c  in CNF:
c     b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_2
c     b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_1
c     b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨  b^{76, 10}_0
c  in DIMACS:
 18392 -18393  18394  684 -18395 0
 18392 -18393  18394  684 -18396 0
 18392 -18393  18394  684  18397 0

c  1-1 --> 0
c    (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0 ∧ -p_684) -> (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧ -b^{76, 10}_0)
c  in CNF:
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_2
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_1
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_0
c  in DIMACS:
 18392  18393 -18394  684 -18395 0
 18392  18393 -18394  684 -18396 0
 18392  18393 -18394  684 -18397 0

c  0-1 --> -1
c    (-b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧ -p_684) -> ( b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0)
c  in CNF:
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨  b^{76, 10}_2
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_1
c     b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨  b^{76, 10}_0
c  in DIMACS:
 18392  18393  18394  684  18395 0
 18392  18393  18394  684 -18396 0
 18392  18393  18394  684  18397 0

c  -1-1 --> -2
c    ( b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧  b^{76, 9}_0 ∧ -p_684) -> ( b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0)
c  in CNF:
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨  b^{76, 10}_2
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨  b^{76, 10}_1
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨  p_684 ∨ -b^{76, 10}_0
c  in DIMACS:
-18392  18393 -18394  684  18395 0
-18392  18393 -18394  684  18396 0
-18392  18393 -18394  684 -18397 0

c  -2-1 --> break 
c    ( b^{76, 9}_2 ∧  b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨  b^{76, 9}_0 ∨  p_684 ∨ break
c  in DIMACS:
-18392 -18393  18394  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 9}_2 ∧ -b^{76, 9}_1 ∧ -b^{76, 9}_0 ∧ true) 
c  in CNF:
c    -b^{76, 9}_2 ∨  b^{76, 9}_1 ∨  b^{76, 9}_0 ∨ false 
c  in DIMACS:
-18392  18393  18394  0

c  3 does not represent an automaton state.
c    -(-b^{76, 9}_2 ∧  b^{76, 9}_1 ∧  b^{76, 9}_0 ∧ true) 
c  in CNF:
c     b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ false 
c  in DIMACS:
 18392 -18393 -18394  0
c  -3 does not represent an automaton state.
c    -( b^{76, 9}_2 ∧  b^{76, 9}_1 ∧  b^{76, 9}_0 ∧ true) 
c  in CNF:
c    -b^{76, 9}_2 ∨ -b^{76, 9}_1 ∨ -b^{76, 9}_0 ∨ false 
c  in DIMACS:
-18392 -18393 -18394  0

c i = 10
c  -2+1 --> -1
c    ( b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧  p_760) -> ( b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0)
c  in CNF:
c    -b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨  b^{76, 11}_2
c    -b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_1
c    -b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨  b^{76, 11}_0
c  in DIMACS:
-18395 -18396  18397 -760  18398 0
-18395 -18396  18397 -760 -18399 0
-18395 -18396  18397 -760  18400 0

c  -1+1 --> 0
c    ( b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0 ∧  p_760) -> (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧ -b^{76, 11}_0)
c  in CNF:
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_2
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_1
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_0
c  in DIMACS:
-18395  18396 -18397 -760 -18398 0
-18395  18396 -18397 -760 -18399 0
-18395  18396 -18397 -760 -18400 0

c  0+1 --> 1
c    (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧  p_760) -> (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0)
c  in CNF:
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_2
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_1
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨  b^{76, 11}_0
c  in DIMACS:
 18395  18396  18397 -760 -18398 0
 18395  18396  18397 -760 -18399 0
 18395  18396  18397 -760  18400 0

c  1+1 --> 2
c    (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0 ∧  p_760) -> (-b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0)
c  in CNF:
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_2
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨  b^{76, 11}_1
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ -p_760 ∨ -b^{76, 11}_0
c  in DIMACS:
 18395  18396 -18397 -760 -18398 0
 18395  18396 -18397 -760  18399 0
 18395  18396 -18397 -760 -18400 0

c  2+1 --> break 
c    (-b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧  p_760) -> break
c  in CNF:
c     b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 18395 -18396  18397 -760 1162 0


c  2-1 --> 1
c    (-b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧ -p_760) -> (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0)
c  in CNF:
c     b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_2
c     b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_1
c     b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨  b^{76, 11}_0
c  in DIMACS:
 18395 -18396  18397  760 -18398 0
 18395 -18396  18397  760 -18399 0
 18395 -18396  18397  760  18400 0

c  1-1 --> 0
c    (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0 ∧ -p_760) -> (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧ -b^{76, 11}_0)
c  in CNF:
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_2
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_1
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_0
c  in DIMACS:
 18395  18396 -18397  760 -18398 0
 18395  18396 -18397  760 -18399 0
 18395  18396 -18397  760 -18400 0

c  0-1 --> -1
c    (-b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧ -p_760) -> ( b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0)
c  in CNF:
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨  b^{76, 11}_2
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_1
c     b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨  b^{76, 11}_0
c  in DIMACS:
 18395  18396  18397  760  18398 0
 18395  18396  18397  760 -18399 0
 18395  18396  18397  760  18400 0

c  -1-1 --> -2
c    ( b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧  b^{76, 10}_0 ∧ -p_760) -> ( b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0)
c  in CNF:
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨  b^{76, 11}_2
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨  b^{76, 11}_1
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨  p_760 ∨ -b^{76, 11}_0
c  in DIMACS:
-18395  18396 -18397  760  18398 0
-18395  18396 -18397  760  18399 0
-18395  18396 -18397  760 -18400 0

c  -2-1 --> break 
c    ( b^{76, 10}_2 ∧  b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨  b^{76, 10}_0 ∨  p_760 ∨ break
c  in DIMACS:
-18395 -18396  18397  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 10}_2 ∧ -b^{76, 10}_1 ∧ -b^{76, 10}_0 ∧ true) 
c  in CNF:
c    -b^{76, 10}_2 ∨  b^{76, 10}_1 ∨  b^{76, 10}_0 ∨ false 
c  in DIMACS:
-18395  18396  18397  0

c  3 does not represent an automaton state.
c    -(-b^{76, 10}_2 ∧  b^{76, 10}_1 ∧  b^{76, 10}_0 ∧ true) 
c  in CNF:
c     b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ false 
c  in DIMACS:
 18395 -18396 -18397  0
c  -3 does not represent an automaton state.
c    -( b^{76, 10}_2 ∧  b^{76, 10}_1 ∧  b^{76, 10}_0 ∧ true) 
c  in CNF:
c    -b^{76, 10}_2 ∨ -b^{76, 10}_1 ∨ -b^{76, 10}_0 ∨ false 
c  in DIMACS:
-18395 -18396 -18397  0

c i = 11
c  -2+1 --> -1
c    ( b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧  p_836) -> ( b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0)
c  in CNF:
c    -b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨  b^{76, 12}_2
c    -b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_1
c    -b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨  b^{76, 12}_0
c  in DIMACS:
-18398 -18399  18400 -836  18401 0
-18398 -18399  18400 -836 -18402 0
-18398 -18399  18400 -836  18403 0

c  -1+1 --> 0
c    ( b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0 ∧  p_836) -> (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧ -b^{76, 12}_0)
c  in CNF:
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_2
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_1
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_0
c  in DIMACS:
-18398  18399 -18400 -836 -18401 0
-18398  18399 -18400 -836 -18402 0
-18398  18399 -18400 -836 -18403 0

c  0+1 --> 1
c    (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧  p_836) -> (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0)
c  in CNF:
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_2
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_1
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨  b^{76, 12}_0
c  in DIMACS:
 18398  18399  18400 -836 -18401 0
 18398  18399  18400 -836 -18402 0
 18398  18399  18400 -836  18403 0

c  1+1 --> 2
c    (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0 ∧  p_836) -> (-b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0)
c  in CNF:
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_2
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨  b^{76, 12}_1
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ -p_836 ∨ -b^{76, 12}_0
c  in DIMACS:
 18398  18399 -18400 -836 -18401 0
 18398  18399 -18400 -836  18402 0
 18398  18399 -18400 -836 -18403 0

c  2+1 --> break 
c    (-b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧  p_836) -> break
c  in CNF:
c     b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 18398 -18399  18400 -836 1162 0


c  2-1 --> 1
c    (-b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧ -p_836) -> (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0)
c  in CNF:
c     b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_2
c     b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_1
c     b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨  b^{76, 12}_0
c  in DIMACS:
 18398 -18399  18400  836 -18401 0
 18398 -18399  18400  836 -18402 0
 18398 -18399  18400  836  18403 0

c  1-1 --> 0
c    (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0 ∧ -p_836) -> (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧ -b^{76, 12}_0)
c  in CNF:
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_2
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_1
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_0
c  in DIMACS:
 18398  18399 -18400  836 -18401 0
 18398  18399 -18400  836 -18402 0
 18398  18399 -18400  836 -18403 0

c  0-1 --> -1
c    (-b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧ -p_836) -> ( b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0)
c  in CNF:
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨  b^{76, 12}_2
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_1
c     b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨  b^{76, 12}_0
c  in DIMACS:
 18398  18399  18400  836  18401 0
 18398  18399  18400  836 -18402 0
 18398  18399  18400  836  18403 0

c  -1-1 --> -2
c    ( b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧  b^{76, 11}_0 ∧ -p_836) -> ( b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0)
c  in CNF:
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨  b^{76, 12}_2
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨  b^{76, 12}_1
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨  p_836 ∨ -b^{76, 12}_0
c  in DIMACS:
-18398  18399 -18400  836  18401 0
-18398  18399 -18400  836  18402 0
-18398  18399 -18400  836 -18403 0

c  -2-1 --> break 
c    ( b^{76, 11}_2 ∧  b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨  b^{76, 11}_0 ∨  p_836 ∨ break
c  in DIMACS:
-18398 -18399  18400  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 11}_2 ∧ -b^{76, 11}_1 ∧ -b^{76, 11}_0 ∧ true) 
c  in CNF:
c    -b^{76, 11}_2 ∨  b^{76, 11}_1 ∨  b^{76, 11}_0 ∨ false 
c  in DIMACS:
-18398  18399  18400  0

c  3 does not represent an automaton state.
c    -(-b^{76, 11}_2 ∧  b^{76, 11}_1 ∧  b^{76, 11}_0 ∧ true) 
c  in CNF:
c     b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ false 
c  in DIMACS:
 18398 -18399 -18400  0
c  -3 does not represent an automaton state.
c    -( b^{76, 11}_2 ∧  b^{76, 11}_1 ∧  b^{76, 11}_0 ∧ true) 
c  in CNF:
c    -b^{76, 11}_2 ∨ -b^{76, 11}_1 ∨ -b^{76, 11}_0 ∨ false 
c  in DIMACS:
-18398 -18399 -18400  0

c i = 12
c  -2+1 --> -1
c    ( b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧  p_912) -> ( b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0)
c  in CNF:
c    -b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨  b^{76, 13}_2
c    -b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_1
c    -b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨  b^{76, 13}_0
c  in DIMACS:
-18401 -18402  18403 -912  18404 0
-18401 -18402  18403 -912 -18405 0
-18401 -18402  18403 -912  18406 0

c  -1+1 --> 0
c    ( b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0 ∧  p_912) -> (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧ -b^{76, 13}_0)
c  in CNF:
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_2
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_1
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_0
c  in DIMACS:
-18401  18402 -18403 -912 -18404 0
-18401  18402 -18403 -912 -18405 0
-18401  18402 -18403 -912 -18406 0

c  0+1 --> 1
c    (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧  p_912) -> (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0)
c  in CNF:
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_2
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_1
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨  b^{76, 13}_0
c  in DIMACS:
 18401  18402  18403 -912 -18404 0
 18401  18402  18403 -912 -18405 0
 18401  18402  18403 -912  18406 0

c  1+1 --> 2
c    (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0 ∧  p_912) -> (-b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0)
c  in CNF:
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_2
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨  b^{76, 13}_1
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ -p_912 ∨ -b^{76, 13}_0
c  in DIMACS:
 18401  18402 -18403 -912 -18404 0
 18401  18402 -18403 -912  18405 0
 18401  18402 -18403 -912 -18406 0

c  2+1 --> break 
c    (-b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧  p_912) -> break
c  in CNF:
c     b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 18401 -18402  18403 -912 1162 0


c  2-1 --> 1
c    (-b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧ -p_912) -> (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0)
c  in CNF:
c     b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_2
c     b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_1
c     b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨  b^{76, 13}_0
c  in DIMACS:
 18401 -18402  18403  912 -18404 0
 18401 -18402  18403  912 -18405 0
 18401 -18402  18403  912  18406 0

c  1-1 --> 0
c    (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0 ∧ -p_912) -> (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧ -b^{76, 13}_0)
c  in CNF:
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_2
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_1
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_0
c  in DIMACS:
 18401  18402 -18403  912 -18404 0
 18401  18402 -18403  912 -18405 0
 18401  18402 -18403  912 -18406 0

c  0-1 --> -1
c    (-b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧ -p_912) -> ( b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0)
c  in CNF:
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨  b^{76, 13}_2
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_1
c     b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨  b^{76, 13}_0
c  in DIMACS:
 18401  18402  18403  912  18404 0
 18401  18402  18403  912 -18405 0
 18401  18402  18403  912  18406 0

c  -1-1 --> -2
c    ( b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧  b^{76, 12}_0 ∧ -p_912) -> ( b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0)
c  in CNF:
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨  b^{76, 13}_2
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨  b^{76, 13}_1
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨  p_912 ∨ -b^{76, 13}_0
c  in DIMACS:
-18401  18402 -18403  912  18404 0
-18401  18402 -18403  912  18405 0
-18401  18402 -18403  912 -18406 0

c  -2-1 --> break 
c    ( b^{76, 12}_2 ∧  b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨  b^{76, 12}_0 ∨  p_912 ∨ break
c  in DIMACS:
-18401 -18402  18403  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 12}_2 ∧ -b^{76, 12}_1 ∧ -b^{76, 12}_0 ∧ true) 
c  in CNF:
c    -b^{76, 12}_2 ∨  b^{76, 12}_1 ∨  b^{76, 12}_0 ∨ false 
c  in DIMACS:
-18401  18402  18403  0

c  3 does not represent an automaton state.
c    -(-b^{76, 12}_2 ∧  b^{76, 12}_1 ∧  b^{76, 12}_0 ∧ true) 
c  in CNF:
c     b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ false 
c  in DIMACS:
 18401 -18402 -18403  0
c  -3 does not represent an automaton state.
c    -( b^{76, 12}_2 ∧  b^{76, 12}_1 ∧  b^{76, 12}_0 ∧ true) 
c  in CNF:
c    -b^{76, 12}_2 ∨ -b^{76, 12}_1 ∨ -b^{76, 12}_0 ∨ false 
c  in DIMACS:
-18401 -18402 -18403  0

c i = 13
c  -2+1 --> -1
c    ( b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧  p_988) -> ( b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0)
c  in CNF:
c    -b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨  b^{76, 14}_2
c    -b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_1
c    -b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨  b^{76, 14}_0
c  in DIMACS:
-18404 -18405  18406 -988  18407 0
-18404 -18405  18406 -988 -18408 0
-18404 -18405  18406 -988  18409 0

c  -1+1 --> 0
c    ( b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0 ∧  p_988) -> (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧ -b^{76, 14}_0)
c  in CNF:
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_2
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_1
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_0
c  in DIMACS:
-18404  18405 -18406 -988 -18407 0
-18404  18405 -18406 -988 -18408 0
-18404  18405 -18406 -988 -18409 0

c  0+1 --> 1
c    (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧  p_988) -> (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0)
c  in CNF:
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_2
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_1
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨  b^{76, 14}_0
c  in DIMACS:
 18404  18405  18406 -988 -18407 0
 18404  18405  18406 -988 -18408 0
 18404  18405  18406 -988  18409 0

c  1+1 --> 2
c    (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0 ∧  p_988) -> (-b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0)
c  in CNF:
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_2
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨  b^{76, 14}_1
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ -p_988 ∨ -b^{76, 14}_0
c  in DIMACS:
 18404  18405 -18406 -988 -18407 0
 18404  18405 -18406 -988  18408 0
 18404  18405 -18406 -988 -18409 0

c  2+1 --> break 
c    (-b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧  p_988) -> break
c  in CNF:
c     b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 18404 -18405  18406 -988 1162 0


c  2-1 --> 1
c    (-b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧ -p_988) -> (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0)
c  in CNF:
c     b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_2
c     b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_1
c     b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨  b^{76, 14}_0
c  in DIMACS:
 18404 -18405  18406  988 -18407 0
 18404 -18405  18406  988 -18408 0
 18404 -18405  18406  988  18409 0

c  1-1 --> 0
c    (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0 ∧ -p_988) -> (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧ -b^{76, 14}_0)
c  in CNF:
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_2
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_1
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_0
c  in DIMACS:
 18404  18405 -18406  988 -18407 0
 18404  18405 -18406  988 -18408 0
 18404  18405 -18406  988 -18409 0

c  0-1 --> -1
c    (-b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧ -p_988) -> ( b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0)
c  in CNF:
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨  b^{76, 14}_2
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_1
c     b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨  b^{76, 14}_0
c  in DIMACS:
 18404  18405  18406  988  18407 0
 18404  18405  18406  988 -18408 0
 18404  18405  18406  988  18409 0

c  -1-1 --> -2
c    ( b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧  b^{76, 13}_0 ∧ -p_988) -> ( b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0)
c  in CNF:
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨  b^{76, 14}_2
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨  b^{76, 14}_1
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨  p_988 ∨ -b^{76, 14}_0
c  in DIMACS:
-18404  18405 -18406  988  18407 0
-18404  18405 -18406  988  18408 0
-18404  18405 -18406  988 -18409 0

c  -2-1 --> break 
c    ( b^{76, 13}_2 ∧  b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨  b^{76, 13}_0 ∨  p_988 ∨ break
c  in DIMACS:
-18404 -18405  18406  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 13}_2 ∧ -b^{76, 13}_1 ∧ -b^{76, 13}_0 ∧ true) 
c  in CNF:
c    -b^{76, 13}_2 ∨  b^{76, 13}_1 ∨  b^{76, 13}_0 ∨ false 
c  in DIMACS:
-18404  18405  18406  0

c  3 does not represent an automaton state.
c    -(-b^{76, 13}_2 ∧  b^{76, 13}_1 ∧  b^{76, 13}_0 ∧ true) 
c  in CNF:
c     b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ false 
c  in DIMACS:
 18404 -18405 -18406  0
c  -3 does not represent an automaton state.
c    -( b^{76, 13}_2 ∧  b^{76, 13}_1 ∧  b^{76, 13}_0 ∧ true) 
c  in CNF:
c    -b^{76, 13}_2 ∨ -b^{76, 13}_1 ∨ -b^{76, 13}_0 ∨ false 
c  in DIMACS:
-18404 -18405 -18406  0

c i = 14
c  -2+1 --> -1
c    ( b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧  p_1064) -> ( b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0)
c  in CNF:
c    -b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨  b^{76, 15}_2
c    -b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_1
c    -b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨  b^{76, 15}_0
c  in DIMACS:
-18407 -18408  18409 -1064  18410 0
-18407 -18408  18409 -1064 -18411 0
-18407 -18408  18409 -1064  18412 0

c  -1+1 --> 0
c    ( b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0 ∧  p_1064) -> (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧ -b^{76, 15}_0)
c  in CNF:
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_2
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_1
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_0
c  in DIMACS:
-18407  18408 -18409 -1064 -18410 0
-18407  18408 -18409 -1064 -18411 0
-18407  18408 -18409 -1064 -18412 0

c  0+1 --> 1
c    (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧  p_1064) -> (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0)
c  in CNF:
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_2
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_1
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨  b^{76, 15}_0
c  in DIMACS:
 18407  18408  18409 -1064 -18410 0
 18407  18408  18409 -1064 -18411 0
 18407  18408  18409 -1064  18412 0

c  1+1 --> 2
c    (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0 ∧  p_1064) -> (-b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0)
c  in CNF:
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_2
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨  b^{76, 15}_1
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ -p_1064 ∨ -b^{76, 15}_0
c  in DIMACS:
 18407  18408 -18409 -1064 -18410 0
 18407  18408 -18409 -1064  18411 0
 18407  18408 -18409 -1064 -18412 0

c  2+1 --> break 
c    (-b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 18407 -18408  18409 -1064 1162 0


c  2-1 --> 1
c    (-b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧ -p_1064) -> (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0)
c  in CNF:
c     b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_2
c     b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_1
c     b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨  b^{76, 15}_0
c  in DIMACS:
 18407 -18408  18409  1064 -18410 0
 18407 -18408  18409  1064 -18411 0
 18407 -18408  18409  1064  18412 0

c  1-1 --> 0
c    (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0 ∧ -p_1064) -> (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧ -b^{76, 15}_0)
c  in CNF:
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_2
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_1
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_0
c  in DIMACS:
 18407  18408 -18409  1064 -18410 0
 18407  18408 -18409  1064 -18411 0
 18407  18408 -18409  1064 -18412 0

c  0-1 --> -1
c    (-b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧ -p_1064) -> ( b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0)
c  in CNF:
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨  b^{76, 15}_2
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_1
c     b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨  b^{76, 15}_0
c  in DIMACS:
 18407  18408  18409  1064  18410 0
 18407  18408  18409  1064 -18411 0
 18407  18408  18409  1064  18412 0

c  -1-1 --> -2
c    ( b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧  b^{76, 14}_0 ∧ -p_1064) -> ( b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0)
c  in CNF:
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨  b^{76, 15}_2
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨  b^{76, 15}_1
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨  p_1064 ∨ -b^{76, 15}_0
c  in DIMACS:
-18407  18408 -18409  1064  18410 0
-18407  18408 -18409  1064  18411 0
-18407  18408 -18409  1064 -18412 0

c  -2-1 --> break 
c    ( b^{76, 14}_2 ∧  b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨  b^{76, 14}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-18407 -18408  18409  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 14}_2 ∧ -b^{76, 14}_1 ∧ -b^{76, 14}_0 ∧ true) 
c  in CNF:
c    -b^{76, 14}_2 ∨  b^{76, 14}_1 ∨  b^{76, 14}_0 ∨ false 
c  in DIMACS:
-18407  18408  18409  0

c  3 does not represent an automaton state.
c    -(-b^{76, 14}_2 ∧  b^{76, 14}_1 ∧  b^{76, 14}_0 ∧ true) 
c  in CNF:
c     b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ false 
c  in DIMACS:
 18407 -18408 -18409  0
c  -3 does not represent an automaton state.
c    -( b^{76, 14}_2 ∧  b^{76, 14}_1 ∧  b^{76, 14}_0 ∧ true) 
c  in CNF:
c    -b^{76, 14}_2 ∨ -b^{76, 14}_1 ∨ -b^{76, 14}_0 ∨ false 
c  in DIMACS:
-18407 -18408 -18409  0

c i = 15
c  -2+1 --> -1
c    ( b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧  p_1140) -> ( b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧  b^{76, 16}_0)
c  in CNF:
c    -b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨  b^{76, 16}_2
c    -b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_1
c    -b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨  b^{76, 16}_0
c  in DIMACS:
-18410 -18411  18412 -1140  18413 0
-18410 -18411  18412 -1140 -18414 0
-18410 -18411  18412 -1140  18415 0

c  -1+1 --> 0
c    ( b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0 ∧  p_1140) -> (-b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧ -b^{76, 16}_0)
c  in CNF:
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_2
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_1
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_0
c  in DIMACS:
-18410  18411 -18412 -1140 -18413 0
-18410  18411 -18412 -1140 -18414 0
-18410  18411 -18412 -1140 -18415 0

c  0+1 --> 1
c    (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧  p_1140) -> (-b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧  b^{76, 16}_0)
c  in CNF:
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_2
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_1
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨  b^{76, 16}_0
c  in DIMACS:
 18410  18411  18412 -1140 -18413 0
 18410  18411  18412 -1140 -18414 0
 18410  18411  18412 -1140  18415 0

c  1+1 --> 2
c    (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0 ∧  p_1140) -> (-b^{76, 16}_2 ∧  b^{76, 16}_1 ∧ -b^{76, 16}_0)
c  in CNF:
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_2
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨  b^{76, 16}_1
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ -p_1140 ∨ -b^{76, 16}_0
c  in DIMACS:
 18410  18411 -18412 -1140 -18413 0
 18410  18411 -18412 -1140  18414 0
 18410  18411 -18412 -1140 -18415 0

c  2+1 --> break 
c    (-b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 18410 -18411  18412 -1140 1162 0


c  2-1 --> 1
c    (-b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧ -p_1140) -> (-b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧  b^{76, 16}_0)
c  in CNF:
c     b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_2
c     b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_1
c     b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨  b^{76, 16}_0
c  in DIMACS:
 18410 -18411  18412  1140 -18413 0
 18410 -18411  18412  1140 -18414 0
 18410 -18411  18412  1140  18415 0

c  1-1 --> 0
c    (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0 ∧ -p_1140) -> (-b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧ -b^{76, 16}_0)
c  in CNF:
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_2
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_1
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_0
c  in DIMACS:
 18410  18411 -18412  1140 -18413 0
 18410  18411 -18412  1140 -18414 0
 18410  18411 -18412  1140 -18415 0

c  0-1 --> -1
c    (-b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧ -p_1140) -> ( b^{76, 16}_2 ∧ -b^{76, 16}_1 ∧  b^{76, 16}_0)
c  in CNF:
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨  b^{76, 16}_2
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_1
c     b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨  b^{76, 16}_0
c  in DIMACS:
 18410  18411  18412  1140  18413 0
 18410  18411  18412  1140 -18414 0
 18410  18411  18412  1140  18415 0

c  -1-1 --> -2
c    ( b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧  b^{76, 15}_0 ∧ -p_1140) -> ( b^{76, 16}_2 ∧  b^{76, 16}_1 ∧ -b^{76, 16}_0)
c  in CNF:
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨  b^{76, 16}_2
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨  b^{76, 16}_1
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨  p_1140 ∨ -b^{76, 16}_0
c  in DIMACS:
-18410  18411 -18412  1140  18413 0
-18410  18411 -18412  1140  18414 0
-18410  18411 -18412  1140 -18415 0

c  -2-1 --> break 
c    ( b^{76, 15}_2 ∧  b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨  b^{76, 15}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-18410 -18411  18412  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{76, 15}_2 ∧ -b^{76, 15}_1 ∧ -b^{76, 15}_0 ∧ true) 
c  in CNF:
c    -b^{76, 15}_2 ∨  b^{76, 15}_1 ∨  b^{76, 15}_0 ∨ false 
c  in DIMACS:
-18410  18411  18412  0

c  3 does not represent an automaton state.
c    -(-b^{76, 15}_2 ∧  b^{76, 15}_1 ∧  b^{76, 15}_0 ∧ true) 
c  in CNF:
c     b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ false 
c  in DIMACS:
 18410 -18411 -18412  0
c  -3 does not represent an automaton state.
c    -( b^{76, 15}_2 ∧  b^{76, 15}_1 ∧  b^{76, 15}_0 ∧ true) 
c  in CNF:
c    -b^{76, 15}_2 ∨ -b^{76, 15}_1 ∨ -b^{76, 15}_0 ∨ false 
c  in DIMACS:
-18410 -18411 -18412  0

c INIT for k = 77
c    -b^{77, 1}_2
c    -b^{77, 1}_1
c    -b^{77, 1}_0
c  in DIMACS:
-18416 0
-18417 0
-18418 0

c Transitions for k = 77
c i = 1
c  -2+1 --> -1
c    ( b^{77, 1}_2 ∧  b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧  p_77) -> ( b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0)
c  in CNF:
c    -b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨  b^{77, 2}_2
c    -b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_1
c    -b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨  b^{77, 2}_0
c  in DIMACS:
-18416 -18417  18418 -77  18419 0
-18416 -18417  18418 -77 -18420 0
-18416 -18417  18418 -77  18421 0

c  -1+1 --> 0
c    ( b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧  b^{77, 1}_0 ∧  p_77) -> (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧ -b^{77, 2}_0)
c  in CNF:
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_2
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_1
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_0
c  in DIMACS:
-18416  18417 -18418 -77 -18419 0
-18416  18417 -18418 -77 -18420 0
-18416  18417 -18418 -77 -18421 0

c  0+1 --> 1
c    (-b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧  p_77) -> (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0)
c  in CNF:
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_2
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_1
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨  b^{77, 2}_0
c  in DIMACS:
 18416  18417  18418 -77 -18419 0
 18416  18417  18418 -77 -18420 0
 18416  18417  18418 -77  18421 0

c  1+1 --> 2
c    (-b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧  b^{77, 1}_0 ∧  p_77) -> (-b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0)
c  in CNF:
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_2
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨  b^{77, 2}_1
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ -p_77 ∨ -b^{77, 2}_0
c  in DIMACS:
 18416  18417 -18418 -77 -18419 0
 18416  18417 -18418 -77  18420 0
 18416  18417 -18418 -77 -18421 0

c  2+1 --> break 
c    (-b^{77, 1}_2 ∧  b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧  p_77) -> break
c  in CNF:
c     b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ -p_77 ∨ break
c  in DIMACS:
 18416 -18417  18418 -77 1162 0


c  2-1 --> 1
c    (-b^{77, 1}_2 ∧  b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧ -p_77) -> (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0)
c  in CNF:
c     b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_2
c     b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_1
c     b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨  b^{77, 2}_0
c  in DIMACS:
 18416 -18417  18418  77 -18419 0
 18416 -18417  18418  77 -18420 0
 18416 -18417  18418  77  18421 0

c  1-1 --> 0
c    (-b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧  b^{77, 1}_0 ∧ -p_77) -> (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧ -b^{77, 2}_0)
c  in CNF:
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_2
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_1
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_0
c  in DIMACS:
 18416  18417 -18418  77 -18419 0
 18416  18417 -18418  77 -18420 0
 18416  18417 -18418  77 -18421 0

c  0-1 --> -1
c    (-b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧ -p_77) -> ( b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0)
c  in CNF:
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨  b^{77, 2}_2
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_1
c     b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨  b^{77, 2}_0
c  in DIMACS:
 18416  18417  18418  77  18419 0
 18416  18417  18418  77 -18420 0
 18416  18417  18418  77  18421 0

c  -1-1 --> -2
c    ( b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧  b^{77, 1}_0 ∧ -p_77) -> ( b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0)
c  in CNF:
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨  b^{77, 2}_2
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨  b^{77, 2}_1
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨  p_77 ∨ -b^{77, 2}_0
c  in DIMACS:
-18416  18417 -18418  77  18419 0
-18416  18417 -18418  77  18420 0
-18416  18417 -18418  77 -18421 0

c  -2-1 --> break 
c    ( b^{77, 1}_2 ∧  b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧ -p_77) -> break
c  in CNF:
c    -b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨  b^{77, 1}_0 ∨  p_77 ∨ break
c  in DIMACS:
-18416 -18417  18418  77 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 1}_2 ∧ -b^{77, 1}_1 ∧ -b^{77, 1}_0 ∧ true) 
c  in CNF:
c    -b^{77, 1}_2 ∨  b^{77, 1}_1 ∨  b^{77, 1}_0 ∨ false 
c  in DIMACS:
-18416  18417  18418  0

c  3 does not represent an automaton state.
c    -(-b^{77, 1}_2 ∧  b^{77, 1}_1 ∧  b^{77, 1}_0 ∧ true) 
c  in CNF:
c     b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ false 
c  in DIMACS:
 18416 -18417 -18418  0
c  -3 does not represent an automaton state.
c    -( b^{77, 1}_2 ∧  b^{77, 1}_1 ∧  b^{77, 1}_0 ∧ true) 
c  in CNF:
c    -b^{77, 1}_2 ∨ -b^{77, 1}_1 ∨ -b^{77, 1}_0 ∨ false 
c  in DIMACS:
-18416 -18417 -18418  0

c i = 2
c  -2+1 --> -1
c    ( b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧  p_154) -> ( b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0)
c  in CNF:
c    -b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨  b^{77, 3}_2
c    -b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_1
c    -b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨  b^{77, 3}_0
c  in DIMACS:
-18419 -18420  18421 -154  18422 0
-18419 -18420  18421 -154 -18423 0
-18419 -18420  18421 -154  18424 0

c  -1+1 --> 0
c    ( b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0 ∧  p_154) -> (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧ -b^{77, 3}_0)
c  in CNF:
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_2
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_1
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_0
c  in DIMACS:
-18419  18420 -18421 -154 -18422 0
-18419  18420 -18421 -154 -18423 0
-18419  18420 -18421 -154 -18424 0

c  0+1 --> 1
c    (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧  p_154) -> (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0)
c  in CNF:
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_2
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_1
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨  b^{77, 3}_0
c  in DIMACS:
 18419  18420  18421 -154 -18422 0
 18419  18420  18421 -154 -18423 0
 18419  18420  18421 -154  18424 0

c  1+1 --> 2
c    (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0 ∧  p_154) -> (-b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0)
c  in CNF:
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_2
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨  b^{77, 3}_1
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ -p_154 ∨ -b^{77, 3}_0
c  in DIMACS:
 18419  18420 -18421 -154 -18422 0
 18419  18420 -18421 -154  18423 0
 18419  18420 -18421 -154 -18424 0

c  2+1 --> break 
c    (-b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧  p_154) -> break
c  in CNF:
c     b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 18419 -18420  18421 -154 1162 0


c  2-1 --> 1
c    (-b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧ -p_154) -> (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0)
c  in CNF:
c     b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_2
c     b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_1
c     b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨  b^{77, 3}_0
c  in DIMACS:
 18419 -18420  18421  154 -18422 0
 18419 -18420  18421  154 -18423 0
 18419 -18420  18421  154  18424 0

c  1-1 --> 0
c    (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0 ∧ -p_154) -> (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧ -b^{77, 3}_0)
c  in CNF:
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_2
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_1
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_0
c  in DIMACS:
 18419  18420 -18421  154 -18422 0
 18419  18420 -18421  154 -18423 0
 18419  18420 -18421  154 -18424 0

c  0-1 --> -1
c    (-b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧ -p_154) -> ( b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0)
c  in CNF:
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨  b^{77, 3}_2
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_1
c     b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨  b^{77, 3}_0
c  in DIMACS:
 18419  18420  18421  154  18422 0
 18419  18420  18421  154 -18423 0
 18419  18420  18421  154  18424 0

c  -1-1 --> -2
c    ( b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧  b^{77, 2}_0 ∧ -p_154) -> ( b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0)
c  in CNF:
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨  b^{77, 3}_2
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨  b^{77, 3}_1
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨  p_154 ∨ -b^{77, 3}_0
c  in DIMACS:
-18419  18420 -18421  154  18422 0
-18419  18420 -18421  154  18423 0
-18419  18420 -18421  154 -18424 0

c  -2-1 --> break 
c    ( b^{77, 2}_2 ∧  b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨  b^{77, 2}_0 ∨  p_154 ∨ break
c  in DIMACS:
-18419 -18420  18421  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 2}_2 ∧ -b^{77, 2}_1 ∧ -b^{77, 2}_0 ∧ true) 
c  in CNF:
c    -b^{77, 2}_2 ∨  b^{77, 2}_1 ∨  b^{77, 2}_0 ∨ false 
c  in DIMACS:
-18419  18420  18421  0

c  3 does not represent an automaton state.
c    -(-b^{77, 2}_2 ∧  b^{77, 2}_1 ∧  b^{77, 2}_0 ∧ true) 
c  in CNF:
c     b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ false 
c  in DIMACS:
 18419 -18420 -18421  0
c  -3 does not represent an automaton state.
c    -( b^{77, 2}_2 ∧  b^{77, 2}_1 ∧  b^{77, 2}_0 ∧ true) 
c  in CNF:
c    -b^{77, 2}_2 ∨ -b^{77, 2}_1 ∨ -b^{77, 2}_0 ∨ false 
c  in DIMACS:
-18419 -18420 -18421  0

c i = 3
c  -2+1 --> -1
c    ( b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧  p_231) -> ( b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0)
c  in CNF:
c    -b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨  b^{77, 4}_2
c    -b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_1
c    -b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨  b^{77, 4}_0
c  in DIMACS:
-18422 -18423  18424 -231  18425 0
-18422 -18423  18424 -231 -18426 0
-18422 -18423  18424 -231  18427 0

c  -1+1 --> 0
c    ( b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0 ∧  p_231) -> (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧ -b^{77, 4}_0)
c  in CNF:
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_2
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_1
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_0
c  in DIMACS:
-18422  18423 -18424 -231 -18425 0
-18422  18423 -18424 -231 -18426 0
-18422  18423 -18424 -231 -18427 0

c  0+1 --> 1
c    (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧  p_231) -> (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0)
c  in CNF:
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_2
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_1
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨  b^{77, 4}_0
c  in DIMACS:
 18422  18423  18424 -231 -18425 0
 18422  18423  18424 -231 -18426 0
 18422  18423  18424 -231  18427 0

c  1+1 --> 2
c    (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0 ∧  p_231) -> (-b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0)
c  in CNF:
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_2
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨  b^{77, 4}_1
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ -p_231 ∨ -b^{77, 4}_0
c  in DIMACS:
 18422  18423 -18424 -231 -18425 0
 18422  18423 -18424 -231  18426 0
 18422  18423 -18424 -231 -18427 0

c  2+1 --> break 
c    (-b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧  p_231) -> break
c  in CNF:
c     b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 18422 -18423  18424 -231 1162 0


c  2-1 --> 1
c    (-b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧ -p_231) -> (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0)
c  in CNF:
c     b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_2
c     b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_1
c     b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨  b^{77, 4}_0
c  in DIMACS:
 18422 -18423  18424  231 -18425 0
 18422 -18423  18424  231 -18426 0
 18422 -18423  18424  231  18427 0

c  1-1 --> 0
c    (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0 ∧ -p_231) -> (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧ -b^{77, 4}_0)
c  in CNF:
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_2
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_1
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_0
c  in DIMACS:
 18422  18423 -18424  231 -18425 0
 18422  18423 -18424  231 -18426 0
 18422  18423 -18424  231 -18427 0

c  0-1 --> -1
c    (-b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧ -p_231) -> ( b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0)
c  in CNF:
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨  b^{77, 4}_2
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_1
c     b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨  b^{77, 4}_0
c  in DIMACS:
 18422  18423  18424  231  18425 0
 18422  18423  18424  231 -18426 0
 18422  18423  18424  231  18427 0

c  -1-1 --> -2
c    ( b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧  b^{77, 3}_0 ∧ -p_231) -> ( b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0)
c  in CNF:
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨  b^{77, 4}_2
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨  b^{77, 4}_1
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨  p_231 ∨ -b^{77, 4}_0
c  in DIMACS:
-18422  18423 -18424  231  18425 0
-18422  18423 -18424  231  18426 0
-18422  18423 -18424  231 -18427 0

c  -2-1 --> break 
c    ( b^{77, 3}_2 ∧  b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨  b^{77, 3}_0 ∨  p_231 ∨ break
c  in DIMACS:
-18422 -18423  18424  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 3}_2 ∧ -b^{77, 3}_1 ∧ -b^{77, 3}_0 ∧ true) 
c  in CNF:
c    -b^{77, 3}_2 ∨  b^{77, 3}_1 ∨  b^{77, 3}_0 ∨ false 
c  in DIMACS:
-18422  18423  18424  0

c  3 does not represent an automaton state.
c    -(-b^{77, 3}_2 ∧  b^{77, 3}_1 ∧  b^{77, 3}_0 ∧ true) 
c  in CNF:
c     b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ false 
c  in DIMACS:
 18422 -18423 -18424  0
c  -3 does not represent an automaton state.
c    -( b^{77, 3}_2 ∧  b^{77, 3}_1 ∧  b^{77, 3}_0 ∧ true) 
c  in CNF:
c    -b^{77, 3}_2 ∨ -b^{77, 3}_1 ∨ -b^{77, 3}_0 ∨ false 
c  in DIMACS:
-18422 -18423 -18424  0

c i = 4
c  -2+1 --> -1
c    ( b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧  p_308) -> ( b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0)
c  in CNF:
c    -b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨  b^{77, 5}_2
c    -b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_1
c    -b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨  b^{77, 5}_0
c  in DIMACS:
-18425 -18426  18427 -308  18428 0
-18425 -18426  18427 -308 -18429 0
-18425 -18426  18427 -308  18430 0

c  -1+1 --> 0
c    ( b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0 ∧  p_308) -> (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧ -b^{77, 5}_0)
c  in CNF:
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_2
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_1
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_0
c  in DIMACS:
-18425  18426 -18427 -308 -18428 0
-18425  18426 -18427 -308 -18429 0
-18425  18426 -18427 -308 -18430 0

c  0+1 --> 1
c    (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧  p_308) -> (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0)
c  in CNF:
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_2
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_1
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨  b^{77, 5}_0
c  in DIMACS:
 18425  18426  18427 -308 -18428 0
 18425  18426  18427 -308 -18429 0
 18425  18426  18427 -308  18430 0

c  1+1 --> 2
c    (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0 ∧  p_308) -> (-b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0)
c  in CNF:
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_2
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨  b^{77, 5}_1
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ -p_308 ∨ -b^{77, 5}_0
c  in DIMACS:
 18425  18426 -18427 -308 -18428 0
 18425  18426 -18427 -308  18429 0
 18425  18426 -18427 -308 -18430 0

c  2+1 --> break 
c    (-b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧  p_308) -> break
c  in CNF:
c     b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 18425 -18426  18427 -308 1162 0


c  2-1 --> 1
c    (-b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧ -p_308) -> (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0)
c  in CNF:
c     b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_2
c     b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_1
c     b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨  b^{77, 5}_0
c  in DIMACS:
 18425 -18426  18427  308 -18428 0
 18425 -18426  18427  308 -18429 0
 18425 -18426  18427  308  18430 0

c  1-1 --> 0
c    (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0 ∧ -p_308) -> (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧ -b^{77, 5}_0)
c  in CNF:
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_2
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_1
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_0
c  in DIMACS:
 18425  18426 -18427  308 -18428 0
 18425  18426 -18427  308 -18429 0
 18425  18426 -18427  308 -18430 0

c  0-1 --> -1
c    (-b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧ -p_308) -> ( b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0)
c  in CNF:
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨  b^{77, 5}_2
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_1
c     b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨  b^{77, 5}_0
c  in DIMACS:
 18425  18426  18427  308  18428 0
 18425  18426  18427  308 -18429 0
 18425  18426  18427  308  18430 0

c  -1-1 --> -2
c    ( b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧  b^{77, 4}_0 ∧ -p_308) -> ( b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0)
c  in CNF:
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨  b^{77, 5}_2
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨  b^{77, 5}_1
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨  p_308 ∨ -b^{77, 5}_0
c  in DIMACS:
-18425  18426 -18427  308  18428 0
-18425  18426 -18427  308  18429 0
-18425  18426 -18427  308 -18430 0

c  -2-1 --> break 
c    ( b^{77, 4}_2 ∧  b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨  b^{77, 4}_0 ∨  p_308 ∨ break
c  in DIMACS:
-18425 -18426  18427  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 4}_2 ∧ -b^{77, 4}_1 ∧ -b^{77, 4}_0 ∧ true) 
c  in CNF:
c    -b^{77, 4}_2 ∨  b^{77, 4}_1 ∨  b^{77, 4}_0 ∨ false 
c  in DIMACS:
-18425  18426  18427  0

c  3 does not represent an automaton state.
c    -(-b^{77, 4}_2 ∧  b^{77, 4}_1 ∧  b^{77, 4}_0 ∧ true) 
c  in CNF:
c     b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ false 
c  in DIMACS:
 18425 -18426 -18427  0
c  -3 does not represent an automaton state.
c    -( b^{77, 4}_2 ∧  b^{77, 4}_1 ∧  b^{77, 4}_0 ∧ true) 
c  in CNF:
c    -b^{77, 4}_2 ∨ -b^{77, 4}_1 ∨ -b^{77, 4}_0 ∨ false 
c  in DIMACS:
-18425 -18426 -18427  0

c i = 5
c  -2+1 --> -1
c    ( b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧  p_385) -> ( b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0)
c  in CNF:
c    -b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨  b^{77, 6}_2
c    -b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_1
c    -b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨  b^{77, 6}_0
c  in DIMACS:
-18428 -18429  18430 -385  18431 0
-18428 -18429  18430 -385 -18432 0
-18428 -18429  18430 -385  18433 0

c  -1+1 --> 0
c    ( b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0 ∧  p_385) -> (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧ -b^{77, 6}_0)
c  in CNF:
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_2
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_1
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_0
c  in DIMACS:
-18428  18429 -18430 -385 -18431 0
-18428  18429 -18430 -385 -18432 0
-18428  18429 -18430 -385 -18433 0

c  0+1 --> 1
c    (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧  p_385) -> (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0)
c  in CNF:
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_2
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_1
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨  b^{77, 6}_0
c  in DIMACS:
 18428  18429  18430 -385 -18431 0
 18428  18429  18430 -385 -18432 0
 18428  18429  18430 -385  18433 0

c  1+1 --> 2
c    (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0 ∧  p_385) -> (-b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0)
c  in CNF:
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_2
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨  b^{77, 6}_1
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ -p_385 ∨ -b^{77, 6}_0
c  in DIMACS:
 18428  18429 -18430 -385 -18431 0
 18428  18429 -18430 -385  18432 0
 18428  18429 -18430 -385 -18433 0

c  2+1 --> break 
c    (-b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧  p_385) -> break
c  in CNF:
c     b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 18428 -18429  18430 -385 1162 0


c  2-1 --> 1
c    (-b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧ -p_385) -> (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0)
c  in CNF:
c     b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_2
c     b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_1
c     b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨  b^{77, 6}_0
c  in DIMACS:
 18428 -18429  18430  385 -18431 0
 18428 -18429  18430  385 -18432 0
 18428 -18429  18430  385  18433 0

c  1-1 --> 0
c    (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0 ∧ -p_385) -> (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧ -b^{77, 6}_0)
c  in CNF:
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_2
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_1
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_0
c  in DIMACS:
 18428  18429 -18430  385 -18431 0
 18428  18429 -18430  385 -18432 0
 18428  18429 -18430  385 -18433 0

c  0-1 --> -1
c    (-b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧ -p_385) -> ( b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0)
c  in CNF:
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨  b^{77, 6}_2
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_1
c     b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨  b^{77, 6}_0
c  in DIMACS:
 18428  18429  18430  385  18431 0
 18428  18429  18430  385 -18432 0
 18428  18429  18430  385  18433 0

c  -1-1 --> -2
c    ( b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧  b^{77, 5}_0 ∧ -p_385) -> ( b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0)
c  in CNF:
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨  b^{77, 6}_2
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨  b^{77, 6}_1
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨  p_385 ∨ -b^{77, 6}_0
c  in DIMACS:
-18428  18429 -18430  385  18431 0
-18428  18429 -18430  385  18432 0
-18428  18429 -18430  385 -18433 0

c  -2-1 --> break 
c    ( b^{77, 5}_2 ∧  b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨  b^{77, 5}_0 ∨  p_385 ∨ break
c  in DIMACS:
-18428 -18429  18430  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 5}_2 ∧ -b^{77, 5}_1 ∧ -b^{77, 5}_0 ∧ true) 
c  in CNF:
c    -b^{77, 5}_2 ∨  b^{77, 5}_1 ∨  b^{77, 5}_0 ∨ false 
c  in DIMACS:
-18428  18429  18430  0

c  3 does not represent an automaton state.
c    -(-b^{77, 5}_2 ∧  b^{77, 5}_1 ∧  b^{77, 5}_0 ∧ true) 
c  in CNF:
c     b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ false 
c  in DIMACS:
 18428 -18429 -18430  0
c  -3 does not represent an automaton state.
c    -( b^{77, 5}_2 ∧  b^{77, 5}_1 ∧  b^{77, 5}_0 ∧ true) 
c  in CNF:
c    -b^{77, 5}_2 ∨ -b^{77, 5}_1 ∨ -b^{77, 5}_0 ∨ false 
c  in DIMACS:
-18428 -18429 -18430  0

c i = 6
c  -2+1 --> -1
c    ( b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧  p_462) -> ( b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0)
c  in CNF:
c    -b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨  b^{77, 7}_2
c    -b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_1
c    -b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨  b^{77, 7}_0
c  in DIMACS:
-18431 -18432  18433 -462  18434 0
-18431 -18432  18433 -462 -18435 0
-18431 -18432  18433 -462  18436 0

c  -1+1 --> 0
c    ( b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0 ∧  p_462) -> (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧ -b^{77, 7}_0)
c  in CNF:
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_2
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_1
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_0
c  in DIMACS:
-18431  18432 -18433 -462 -18434 0
-18431  18432 -18433 -462 -18435 0
-18431  18432 -18433 -462 -18436 0

c  0+1 --> 1
c    (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧  p_462) -> (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0)
c  in CNF:
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_2
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_1
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨  b^{77, 7}_0
c  in DIMACS:
 18431  18432  18433 -462 -18434 0
 18431  18432  18433 -462 -18435 0
 18431  18432  18433 -462  18436 0

c  1+1 --> 2
c    (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0 ∧  p_462) -> (-b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0)
c  in CNF:
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_2
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨  b^{77, 7}_1
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ -p_462 ∨ -b^{77, 7}_0
c  in DIMACS:
 18431  18432 -18433 -462 -18434 0
 18431  18432 -18433 -462  18435 0
 18431  18432 -18433 -462 -18436 0

c  2+1 --> break 
c    (-b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧  p_462) -> break
c  in CNF:
c     b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 18431 -18432  18433 -462 1162 0


c  2-1 --> 1
c    (-b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧ -p_462) -> (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0)
c  in CNF:
c     b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_2
c     b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_1
c     b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨  b^{77, 7}_0
c  in DIMACS:
 18431 -18432  18433  462 -18434 0
 18431 -18432  18433  462 -18435 0
 18431 -18432  18433  462  18436 0

c  1-1 --> 0
c    (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0 ∧ -p_462) -> (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧ -b^{77, 7}_0)
c  in CNF:
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_2
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_1
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_0
c  in DIMACS:
 18431  18432 -18433  462 -18434 0
 18431  18432 -18433  462 -18435 0
 18431  18432 -18433  462 -18436 0

c  0-1 --> -1
c    (-b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧ -p_462) -> ( b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0)
c  in CNF:
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨  b^{77, 7}_2
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_1
c     b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨  b^{77, 7}_0
c  in DIMACS:
 18431  18432  18433  462  18434 0
 18431  18432  18433  462 -18435 0
 18431  18432  18433  462  18436 0

c  -1-1 --> -2
c    ( b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧  b^{77, 6}_0 ∧ -p_462) -> ( b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0)
c  in CNF:
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨  b^{77, 7}_2
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨  b^{77, 7}_1
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨  p_462 ∨ -b^{77, 7}_0
c  in DIMACS:
-18431  18432 -18433  462  18434 0
-18431  18432 -18433  462  18435 0
-18431  18432 -18433  462 -18436 0

c  -2-1 --> break 
c    ( b^{77, 6}_2 ∧  b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨  b^{77, 6}_0 ∨  p_462 ∨ break
c  in DIMACS:
-18431 -18432  18433  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 6}_2 ∧ -b^{77, 6}_1 ∧ -b^{77, 6}_0 ∧ true) 
c  in CNF:
c    -b^{77, 6}_2 ∨  b^{77, 6}_1 ∨  b^{77, 6}_0 ∨ false 
c  in DIMACS:
-18431  18432  18433  0

c  3 does not represent an automaton state.
c    -(-b^{77, 6}_2 ∧  b^{77, 6}_1 ∧  b^{77, 6}_0 ∧ true) 
c  in CNF:
c     b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ false 
c  in DIMACS:
 18431 -18432 -18433  0
c  -3 does not represent an automaton state.
c    -( b^{77, 6}_2 ∧  b^{77, 6}_1 ∧  b^{77, 6}_0 ∧ true) 
c  in CNF:
c    -b^{77, 6}_2 ∨ -b^{77, 6}_1 ∨ -b^{77, 6}_0 ∨ false 
c  in DIMACS:
-18431 -18432 -18433  0

c i = 7
c  -2+1 --> -1
c    ( b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧  p_539) -> ( b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0)
c  in CNF:
c    -b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨  b^{77, 8}_2
c    -b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_1
c    -b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨  b^{77, 8}_0
c  in DIMACS:
-18434 -18435  18436 -539  18437 0
-18434 -18435  18436 -539 -18438 0
-18434 -18435  18436 -539  18439 0

c  -1+1 --> 0
c    ( b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0 ∧  p_539) -> (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧ -b^{77, 8}_0)
c  in CNF:
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_2
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_1
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_0
c  in DIMACS:
-18434  18435 -18436 -539 -18437 0
-18434  18435 -18436 -539 -18438 0
-18434  18435 -18436 -539 -18439 0

c  0+1 --> 1
c    (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧  p_539) -> (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0)
c  in CNF:
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_2
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_1
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨  b^{77, 8}_0
c  in DIMACS:
 18434  18435  18436 -539 -18437 0
 18434  18435  18436 -539 -18438 0
 18434  18435  18436 -539  18439 0

c  1+1 --> 2
c    (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0 ∧  p_539) -> (-b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0)
c  in CNF:
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_2
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨  b^{77, 8}_1
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ -p_539 ∨ -b^{77, 8}_0
c  in DIMACS:
 18434  18435 -18436 -539 -18437 0
 18434  18435 -18436 -539  18438 0
 18434  18435 -18436 -539 -18439 0

c  2+1 --> break 
c    (-b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧  p_539) -> break
c  in CNF:
c     b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ -p_539 ∨ break
c  in DIMACS:
 18434 -18435  18436 -539 1162 0


c  2-1 --> 1
c    (-b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧ -p_539) -> (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0)
c  in CNF:
c     b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_2
c     b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_1
c     b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨  b^{77, 8}_0
c  in DIMACS:
 18434 -18435  18436  539 -18437 0
 18434 -18435  18436  539 -18438 0
 18434 -18435  18436  539  18439 0

c  1-1 --> 0
c    (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0 ∧ -p_539) -> (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧ -b^{77, 8}_0)
c  in CNF:
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_2
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_1
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_0
c  in DIMACS:
 18434  18435 -18436  539 -18437 0
 18434  18435 -18436  539 -18438 0
 18434  18435 -18436  539 -18439 0

c  0-1 --> -1
c    (-b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧ -p_539) -> ( b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0)
c  in CNF:
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨  b^{77, 8}_2
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_1
c     b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨  b^{77, 8}_0
c  in DIMACS:
 18434  18435  18436  539  18437 0
 18434  18435  18436  539 -18438 0
 18434  18435  18436  539  18439 0

c  -1-1 --> -2
c    ( b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧  b^{77, 7}_0 ∧ -p_539) -> ( b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0)
c  in CNF:
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨  b^{77, 8}_2
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨  b^{77, 8}_1
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨  p_539 ∨ -b^{77, 8}_0
c  in DIMACS:
-18434  18435 -18436  539  18437 0
-18434  18435 -18436  539  18438 0
-18434  18435 -18436  539 -18439 0

c  -2-1 --> break 
c    ( b^{77, 7}_2 ∧  b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧ -p_539) -> break
c  in CNF:
c    -b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨  b^{77, 7}_0 ∨  p_539 ∨ break
c  in DIMACS:
-18434 -18435  18436  539 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 7}_2 ∧ -b^{77, 7}_1 ∧ -b^{77, 7}_0 ∧ true) 
c  in CNF:
c    -b^{77, 7}_2 ∨  b^{77, 7}_1 ∨  b^{77, 7}_0 ∨ false 
c  in DIMACS:
-18434  18435  18436  0

c  3 does not represent an automaton state.
c    -(-b^{77, 7}_2 ∧  b^{77, 7}_1 ∧  b^{77, 7}_0 ∧ true) 
c  in CNF:
c     b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ false 
c  in DIMACS:
 18434 -18435 -18436  0
c  -3 does not represent an automaton state.
c    -( b^{77, 7}_2 ∧  b^{77, 7}_1 ∧  b^{77, 7}_0 ∧ true) 
c  in CNF:
c    -b^{77, 7}_2 ∨ -b^{77, 7}_1 ∨ -b^{77, 7}_0 ∨ false 
c  in DIMACS:
-18434 -18435 -18436  0

c i = 8
c  -2+1 --> -1
c    ( b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧  p_616) -> ( b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0)
c  in CNF:
c    -b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨  b^{77, 9}_2
c    -b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_1
c    -b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨  b^{77, 9}_0
c  in DIMACS:
-18437 -18438  18439 -616  18440 0
-18437 -18438  18439 -616 -18441 0
-18437 -18438  18439 -616  18442 0

c  -1+1 --> 0
c    ( b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0 ∧  p_616) -> (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧ -b^{77, 9}_0)
c  in CNF:
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_2
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_1
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_0
c  in DIMACS:
-18437  18438 -18439 -616 -18440 0
-18437  18438 -18439 -616 -18441 0
-18437  18438 -18439 -616 -18442 0

c  0+1 --> 1
c    (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧  p_616) -> (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0)
c  in CNF:
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_2
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_1
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨  b^{77, 9}_0
c  in DIMACS:
 18437  18438  18439 -616 -18440 0
 18437  18438  18439 -616 -18441 0
 18437  18438  18439 -616  18442 0

c  1+1 --> 2
c    (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0 ∧  p_616) -> (-b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0)
c  in CNF:
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_2
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨  b^{77, 9}_1
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ -p_616 ∨ -b^{77, 9}_0
c  in DIMACS:
 18437  18438 -18439 -616 -18440 0
 18437  18438 -18439 -616  18441 0
 18437  18438 -18439 -616 -18442 0

c  2+1 --> break 
c    (-b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧  p_616) -> break
c  in CNF:
c     b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 18437 -18438  18439 -616 1162 0


c  2-1 --> 1
c    (-b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧ -p_616) -> (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0)
c  in CNF:
c     b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_2
c     b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_1
c     b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨  b^{77, 9}_0
c  in DIMACS:
 18437 -18438  18439  616 -18440 0
 18437 -18438  18439  616 -18441 0
 18437 -18438  18439  616  18442 0

c  1-1 --> 0
c    (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0 ∧ -p_616) -> (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧ -b^{77, 9}_0)
c  in CNF:
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_2
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_1
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_0
c  in DIMACS:
 18437  18438 -18439  616 -18440 0
 18437  18438 -18439  616 -18441 0
 18437  18438 -18439  616 -18442 0

c  0-1 --> -1
c    (-b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧ -p_616) -> ( b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0)
c  in CNF:
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨  b^{77, 9}_2
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_1
c     b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨  b^{77, 9}_0
c  in DIMACS:
 18437  18438  18439  616  18440 0
 18437  18438  18439  616 -18441 0
 18437  18438  18439  616  18442 0

c  -1-1 --> -2
c    ( b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧  b^{77, 8}_0 ∧ -p_616) -> ( b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0)
c  in CNF:
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨  b^{77, 9}_2
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨  b^{77, 9}_1
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨  p_616 ∨ -b^{77, 9}_0
c  in DIMACS:
-18437  18438 -18439  616  18440 0
-18437  18438 -18439  616  18441 0
-18437  18438 -18439  616 -18442 0

c  -2-1 --> break 
c    ( b^{77, 8}_2 ∧  b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨  b^{77, 8}_0 ∨  p_616 ∨ break
c  in DIMACS:
-18437 -18438  18439  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 8}_2 ∧ -b^{77, 8}_1 ∧ -b^{77, 8}_0 ∧ true) 
c  in CNF:
c    -b^{77, 8}_2 ∨  b^{77, 8}_1 ∨  b^{77, 8}_0 ∨ false 
c  in DIMACS:
-18437  18438  18439  0

c  3 does not represent an automaton state.
c    -(-b^{77, 8}_2 ∧  b^{77, 8}_1 ∧  b^{77, 8}_0 ∧ true) 
c  in CNF:
c     b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ false 
c  in DIMACS:
 18437 -18438 -18439  0
c  -3 does not represent an automaton state.
c    -( b^{77, 8}_2 ∧  b^{77, 8}_1 ∧  b^{77, 8}_0 ∧ true) 
c  in CNF:
c    -b^{77, 8}_2 ∨ -b^{77, 8}_1 ∨ -b^{77, 8}_0 ∨ false 
c  in DIMACS:
-18437 -18438 -18439  0

c i = 9
c  -2+1 --> -1
c    ( b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧  p_693) -> ( b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0)
c  in CNF:
c    -b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨  b^{77, 10}_2
c    -b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_1
c    -b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨  b^{77, 10}_0
c  in DIMACS:
-18440 -18441  18442 -693  18443 0
-18440 -18441  18442 -693 -18444 0
-18440 -18441  18442 -693  18445 0

c  -1+1 --> 0
c    ( b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0 ∧  p_693) -> (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧ -b^{77, 10}_0)
c  in CNF:
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_2
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_1
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_0
c  in DIMACS:
-18440  18441 -18442 -693 -18443 0
-18440  18441 -18442 -693 -18444 0
-18440  18441 -18442 -693 -18445 0

c  0+1 --> 1
c    (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧  p_693) -> (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0)
c  in CNF:
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_2
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_1
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨  b^{77, 10}_0
c  in DIMACS:
 18440  18441  18442 -693 -18443 0
 18440  18441  18442 -693 -18444 0
 18440  18441  18442 -693  18445 0

c  1+1 --> 2
c    (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0 ∧  p_693) -> (-b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0)
c  in CNF:
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_2
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨  b^{77, 10}_1
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ -p_693 ∨ -b^{77, 10}_0
c  in DIMACS:
 18440  18441 -18442 -693 -18443 0
 18440  18441 -18442 -693  18444 0
 18440  18441 -18442 -693 -18445 0

c  2+1 --> break 
c    (-b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧  p_693) -> break
c  in CNF:
c     b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 18440 -18441  18442 -693 1162 0


c  2-1 --> 1
c    (-b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧ -p_693) -> (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0)
c  in CNF:
c     b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_2
c     b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_1
c     b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨  b^{77, 10}_0
c  in DIMACS:
 18440 -18441  18442  693 -18443 0
 18440 -18441  18442  693 -18444 0
 18440 -18441  18442  693  18445 0

c  1-1 --> 0
c    (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0 ∧ -p_693) -> (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧ -b^{77, 10}_0)
c  in CNF:
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_2
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_1
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_0
c  in DIMACS:
 18440  18441 -18442  693 -18443 0
 18440  18441 -18442  693 -18444 0
 18440  18441 -18442  693 -18445 0

c  0-1 --> -1
c    (-b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧ -p_693) -> ( b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0)
c  in CNF:
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨  b^{77, 10}_2
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_1
c     b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨  b^{77, 10}_0
c  in DIMACS:
 18440  18441  18442  693  18443 0
 18440  18441  18442  693 -18444 0
 18440  18441  18442  693  18445 0

c  -1-1 --> -2
c    ( b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧  b^{77, 9}_0 ∧ -p_693) -> ( b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0)
c  in CNF:
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨  b^{77, 10}_2
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨  b^{77, 10}_1
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨  p_693 ∨ -b^{77, 10}_0
c  in DIMACS:
-18440  18441 -18442  693  18443 0
-18440  18441 -18442  693  18444 0
-18440  18441 -18442  693 -18445 0

c  -2-1 --> break 
c    ( b^{77, 9}_2 ∧  b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨  b^{77, 9}_0 ∨  p_693 ∨ break
c  in DIMACS:
-18440 -18441  18442  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 9}_2 ∧ -b^{77, 9}_1 ∧ -b^{77, 9}_0 ∧ true) 
c  in CNF:
c    -b^{77, 9}_2 ∨  b^{77, 9}_1 ∨  b^{77, 9}_0 ∨ false 
c  in DIMACS:
-18440  18441  18442  0

c  3 does not represent an automaton state.
c    -(-b^{77, 9}_2 ∧  b^{77, 9}_1 ∧  b^{77, 9}_0 ∧ true) 
c  in CNF:
c     b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ false 
c  in DIMACS:
 18440 -18441 -18442  0
c  -3 does not represent an automaton state.
c    -( b^{77, 9}_2 ∧  b^{77, 9}_1 ∧  b^{77, 9}_0 ∧ true) 
c  in CNF:
c    -b^{77, 9}_2 ∨ -b^{77, 9}_1 ∨ -b^{77, 9}_0 ∨ false 
c  in DIMACS:
-18440 -18441 -18442  0

c i = 10
c  -2+1 --> -1
c    ( b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧  p_770) -> ( b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0)
c  in CNF:
c    -b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨  b^{77, 11}_2
c    -b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_1
c    -b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨  b^{77, 11}_0
c  in DIMACS:
-18443 -18444  18445 -770  18446 0
-18443 -18444  18445 -770 -18447 0
-18443 -18444  18445 -770  18448 0

c  -1+1 --> 0
c    ( b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0 ∧  p_770) -> (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧ -b^{77, 11}_0)
c  in CNF:
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_2
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_1
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_0
c  in DIMACS:
-18443  18444 -18445 -770 -18446 0
-18443  18444 -18445 -770 -18447 0
-18443  18444 -18445 -770 -18448 0

c  0+1 --> 1
c    (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧  p_770) -> (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0)
c  in CNF:
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_2
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_1
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨  b^{77, 11}_0
c  in DIMACS:
 18443  18444  18445 -770 -18446 0
 18443  18444  18445 -770 -18447 0
 18443  18444  18445 -770  18448 0

c  1+1 --> 2
c    (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0 ∧  p_770) -> (-b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0)
c  in CNF:
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_2
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨  b^{77, 11}_1
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ -p_770 ∨ -b^{77, 11}_0
c  in DIMACS:
 18443  18444 -18445 -770 -18446 0
 18443  18444 -18445 -770  18447 0
 18443  18444 -18445 -770 -18448 0

c  2+1 --> break 
c    (-b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧  p_770) -> break
c  in CNF:
c     b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 18443 -18444  18445 -770 1162 0


c  2-1 --> 1
c    (-b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧ -p_770) -> (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0)
c  in CNF:
c     b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_2
c     b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_1
c     b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨  b^{77, 11}_0
c  in DIMACS:
 18443 -18444  18445  770 -18446 0
 18443 -18444  18445  770 -18447 0
 18443 -18444  18445  770  18448 0

c  1-1 --> 0
c    (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0 ∧ -p_770) -> (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧ -b^{77, 11}_0)
c  in CNF:
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_2
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_1
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_0
c  in DIMACS:
 18443  18444 -18445  770 -18446 0
 18443  18444 -18445  770 -18447 0
 18443  18444 -18445  770 -18448 0

c  0-1 --> -1
c    (-b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧ -p_770) -> ( b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0)
c  in CNF:
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨  b^{77, 11}_2
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_1
c     b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨  b^{77, 11}_0
c  in DIMACS:
 18443  18444  18445  770  18446 0
 18443  18444  18445  770 -18447 0
 18443  18444  18445  770  18448 0

c  -1-1 --> -2
c    ( b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧  b^{77, 10}_0 ∧ -p_770) -> ( b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0)
c  in CNF:
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨  b^{77, 11}_2
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨  b^{77, 11}_1
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨  p_770 ∨ -b^{77, 11}_0
c  in DIMACS:
-18443  18444 -18445  770  18446 0
-18443  18444 -18445  770  18447 0
-18443  18444 -18445  770 -18448 0

c  -2-1 --> break 
c    ( b^{77, 10}_2 ∧  b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨  b^{77, 10}_0 ∨  p_770 ∨ break
c  in DIMACS:
-18443 -18444  18445  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 10}_2 ∧ -b^{77, 10}_1 ∧ -b^{77, 10}_0 ∧ true) 
c  in CNF:
c    -b^{77, 10}_2 ∨  b^{77, 10}_1 ∨  b^{77, 10}_0 ∨ false 
c  in DIMACS:
-18443  18444  18445  0

c  3 does not represent an automaton state.
c    -(-b^{77, 10}_2 ∧  b^{77, 10}_1 ∧  b^{77, 10}_0 ∧ true) 
c  in CNF:
c     b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ false 
c  in DIMACS:
 18443 -18444 -18445  0
c  -3 does not represent an automaton state.
c    -( b^{77, 10}_2 ∧  b^{77, 10}_1 ∧  b^{77, 10}_0 ∧ true) 
c  in CNF:
c    -b^{77, 10}_2 ∨ -b^{77, 10}_1 ∨ -b^{77, 10}_0 ∨ false 
c  in DIMACS:
-18443 -18444 -18445  0

c i = 11
c  -2+1 --> -1
c    ( b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧  p_847) -> ( b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0)
c  in CNF:
c    -b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨  b^{77, 12}_2
c    -b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_1
c    -b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨  b^{77, 12}_0
c  in DIMACS:
-18446 -18447  18448 -847  18449 0
-18446 -18447  18448 -847 -18450 0
-18446 -18447  18448 -847  18451 0

c  -1+1 --> 0
c    ( b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0 ∧  p_847) -> (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧ -b^{77, 12}_0)
c  in CNF:
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_2
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_1
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_0
c  in DIMACS:
-18446  18447 -18448 -847 -18449 0
-18446  18447 -18448 -847 -18450 0
-18446  18447 -18448 -847 -18451 0

c  0+1 --> 1
c    (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧  p_847) -> (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0)
c  in CNF:
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_2
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_1
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨  b^{77, 12}_0
c  in DIMACS:
 18446  18447  18448 -847 -18449 0
 18446  18447  18448 -847 -18450 0
 18446  18447  18448 -847  18451 0

c  1+1 --> 2
c    (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0 ∧  p_847) -> (-b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0)
c  in CNF:
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_2
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨  b^{77, 12}_1
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ -p_847 ∨ -b^{77, 12}_0
c  in DIMACS:
 18446  18447 -18448 -847 -18449 0
 18446  18447 -18448 -847  18450 0
 18446  18447 -18448 -847 -18451 0

c  2+1 --> break 
c    (-b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧  p_847) -> break
c  in CNF:
c     b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ -p_847 ∨ break
c  in DIMACS:
 18446 -18447  18448 -847 1162 0


c  2-1 --> 1
c    (-b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧ -p_847) -> (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0)
c  in CNF:
c     b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_2
c     b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_1
c     b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨  b^{77, 12}_0
c  in DIMACS:
 18446 -18447  18448  847 -18449 0
 18446 -18447  18448  847 -18450 0
 18446 -18447  18448  847  18451 0

c  1-1 --> 0
c    (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0 ∧ -p_847) -> (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧ -b^{77, 12}_0)
c  in CNF:
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_2
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_1
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_0
c  in DIMACS:
 18446  18447 -18448  847 -18449 0
 18446  18447 -18448  847 -18450 0
 18446  18447 -18448  847 -18451 0

c  0-1 --> -1
c    (-b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧ -p_847) -> ( b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0)
c  in CNF:
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨  b^{77, 12}_2
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_1
c     b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨  b^{77, 12}_0
c  in DIMACS:
 18446  18447  18448  847  18449 0
 18446  18447  18448  847 -18450 0
 18446  18447  18448  847  18451 0

c  -1-1 --> -2
c    ( b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧  b^{77, 11}_0 ∧ -p_847) -> ( b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0)
c  in CNF:
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨  b^{77, 12}_2
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨  b^{77, 12}_1
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨  p_847 ∨ -b^{77, 12}_0
c  in DIMACS:
-18446  18447 -18448  847  18449 0
-18446  18447 -18448  847  18450 0
-18446  18447 -18448  847 -18451 0

c  -2-1 --> break 
c    ( b^{77, 11}_2 ∧  b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧ -p_847) -> break
c  in CNF:
c    -b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨  b^{77, 11}_0 ∨  p_847 ∨ break
c  in DIMACS:
-18446 -18447  18448  847 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 11}_2 ∧ -b^{77, 11}_1 ∧ -b^{77, 11}_0 ∧ true) 
c  in CNF:
c    -b^{77, 11}_2 ∨  b^{77, 11}_1 ∨  b^{77, 11}_0 ∨ false 
c  in DIMACS:
-18446  18447  18448  0

c  3 does not represent an automaton state.
c    -(-b^{77, 11}_2 ∧  b^{77, 11}_1 ∧  b^{77, 11}_0 ∧ true) 
c  in CNF:
c     b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ false 
c  in DIMACS:
 18446 -18447 -18448  0
c  -3 does not represent an automaton state.
c    -( b^{77, 11}_2 ∧  b^{77, 11}_1 ∧  b^{77, 11}_0 ∧ true) 
c  in CNF:
c    -b^{77, 11}_2 ∨ -b^{77, 11}_1 ∨ -b^{77, 11}_0 ∨ false 
c  in DIMACS:
-18446 -18447 -18448  0

c i = 12
c  -2+1 --> -1
c    ( b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧  p_924) -> ( b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0)
c  in CNF:
c    -b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨  b^{77, 13}_2
c    -b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_1
c    -b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨  b^{77, 13}_0
c  in DIMACS:
-18449 -18450  18451 -924  18452 0
-18449 -18450  18451 -924 -18453 0
-18449 -18450  18451 -924  18454 0

c  -1+1 --> 0
c    ( b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0 ∧  p_924) -> (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧ -b^{77, 13}_0)
c  in CNF:
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_2
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_1
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_0
c  in DIMACS:
-18449  18450 -18451 -924 -18452 0
-18449  18450 -18451 -924 -18453 0
-18449  18450 -18451 -924 -18454 0

c  0+1 --> 1
c    (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧  p_924) -> (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0)
c  in CNF:
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_2
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_1
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨  b^{77, 13}_0
c  in DIMACS:
 18449  18450  18451 -924 -18452 0
 18449  18450  18451 -924 -18453 0
 18449  18450  18451 -924  18454 0

c  1+1 --> 2
c    (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0 ∧  p_924) -> (-b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0)
c  in CNF:
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_2
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨  b^{77, 13}_1
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ -p_924 ∨ -b^{77, 13}_0
c  in DIMACS:
 18449  18450 -18451 -924 -18452 0
 18449  18450 -18451 -924  18453 0
 18449  18450 -18451 -924 -18454 0

c  2+1 --> break 
c    (-b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧  p_924) -> break
c  in CNF:
c     b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 18449 -18450  18451 -924 1162 0


c  2-1 --> 1
c    (-b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧ -p_924) -> (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0)
c  in CNF:
c     b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_2
c     b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_1
c     b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨  b^{77, 13}_0
c  in DIMACS:
 18449 -18450  18451  924 -18452 0
 18449 -18450  18451  924 -18453 0
 18449 -18450  18451  924  18454 0

c  1-1 --> 0
c    (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0 ∧ -p_924) -> (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧ -b^{77, 13}_0)
c  in CNF:
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_2
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_1
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_0
c  in DIMACS:
 18449  18450 -18451  924 -18452 0
 18449  18450 -18451  924 -18453 0
 18449  18450 -18451  924 -18454 0

c  0-1 --> -1
c    (-b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧ -p_924) -> ( b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0)
c  in CNF:
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨  b^{77, 13}_2
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_1
c     b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨  b^{77, 13}_0
c  in DIMACS:
 18449  18450  18451  924  18452 0
 18449  18450  18451  924 -18453 0
 18449  18450  18451  924  18454 0

c  -1-1 --> -2
c    ( b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧  b^{77, 12}_0 ∧ -p_924) -> ( b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0)
c  in CNF:
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨  b^{77, 13}_2
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨  b^{77, 13}_1
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨  p_924 ∨ -b^{77, 13}_0
c  in DIMACS:
-18449  18450 -18451  924  18452 0
-18449  18450 -18451  924  18453 0
-18449  18450 -18451  924 -18454 0

c  -2-1 --> break 
c    ( b^{77, 12}_2 ∧  b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨  b^{77, 12}_0 ∨  p_924 ∨ break
c  in DIMACS:
-18449 -18450  18451  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 12}_2 ∧ -b^{77, 12}_1 ∧ -b^{77, 12}_0 ∧ true) 
c  in CNF:
c    -b^{77, 12}_2 ∨  b^{77, 12}_1 ∨  b^{77, 12}_0 ∨ false 
c  in DIMACS:
-18449  18450  18451  0

c  3 does not represent an automaton state.
c    -(-b^{77, 12}_2 ∧  b^{77, 12}_1 ∧  b^{77, 12}_0 ∧ true) 
c  in CNF:
c     b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ false 
c  in DIMACS:
 18449 -18450 -18451  0
c  -3 does not represent an automaton state.
c    -( b^{77, 12}_2 ∧  b^{77, 12}_1 ∧  b^{77, 12}_0 ∧ true) 
c  in CNF:
c    -b^{77, 12}_2 ∨ -b^{77, 12}_1 ∨ -b^{77, 12}_0 ∨ false 
c  in DIMACS:
-18449 -18450 -18451  0

c i = 13
c  -2+1 --> -1
c    ( b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧  p_1001) -> ( b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0)
c  in CNF:
c    -b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨  b^{77, 14}_2
c    -b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_1
c    -b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨  b^{77, 14}_0
c  in DIMACS:
-18452 -18453  18454 -1001  18455 0
-18452 -18453  18454 -1001 -18456 0
-18452 -18453  18454 -1001  18457 0

c  -1+1 --> 0
c    ( b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0 ∧  p_1001) -> (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧ -b^{77, 14}_0)
c  in CNF:
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_2
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_1
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_0
c  in DIMACS:
-18452  18453 -18454 -1001 -18455 0
-18452  18453 -18454 -1001 -18456 0
-18452  18453 -18454 -1001 -18457 0

c  0+1 --> 1
c    (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧  p_1001) -> (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0)
c  in CNF:
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_2
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_1
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨  b^{77, 14}_0
c  in DIMACS:
 18452  18453  18454 -1001 -18455 0
 18452  18453  18454 -1001 -18456 0
 18452  18453  18454 -1001  18457 0

c  1+1 --> 2
c    (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0 ∧  p_1001) -> (-b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0)
c  in CNF:
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_2
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨  b^{77, 14}_1
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ -p_1001 ∨ -b^{77, 14}_0
c  in DIMACS:
 18452  18453 -18454 -1001 -18455 0
 18452  18453 -18454 -1001  18456 0
 18452  18453 -18454 -1001 -18457 0

c  2+1 --> break 
c    (-b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 18452 -18453  18454 -1001 1162 0


c  2-1 --> 1
c    (-b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧ -p_1001) -> (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0)
c  in CNF:
c     b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_2
c     b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_1
c     b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨  b^{77, 14}_0
c  in DIMACS:
 18452 -18453  18454  1001 -18455 0
 18452 -18453  18454  1001 -18456 0
 18452 -18453  18454  1001  18457 0

c  1-1 --> 0
c    (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0 ∧ -p_1001) -> (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧ -b^{77, 14}_0)
c  in CNF:
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_2
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_1
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_0
c  in DIMACS:
 18452  18453 -18454  1001 -18455 0
 18452  18453 -18454  1001 -18456 0
 18452  18453 -18454  1001 -18457 0

c  0-1 --> -1
c    (-b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧ -p_1001) -> ( b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0)
c  in CNF:
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨  b^{77, 14}_2
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_1
c     b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨  b^{77, 14}_0
c  in DIMACS:
 18452  18453  18454  1001  18455 0
 18452  18453  18454  1001 -18456 0
 18452  18453  18454  1001  18457 0

c  -1-1 --> -2
c    ( b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧  b^{77, 13}_0 ∧ -p_1001) -> ( b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0)
c  in CNF:
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨  b^{77, 14}_2
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨  b^{77, 14}_1
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨  p_1001 ∨ -b^{77, 14}_0
c  in DIMACS:
-18452  18453 -18454  1001  18455 0
-18452  18453 -18454  1001  18456 0
-18452  18453 -18454  1001 -18457 0

c  -2-1 --> break 
c    ( b^{77, 13}_2 ∧  b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨  b^{77, 13}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-18452 -18453  18454  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 13}_2 ∧ -b^{77, 13}_1 ∧ -b^{77, 13}_0 ∧ true) 
c  in CNF:
c    -b^{77, 13}_2 ∨  b^{77, 13}_1 ∨  b^{77, 13}_0 ∨ false 
c  in DIMACS:
-18452  18453  18454  0

c  3 does not represent an automaton state.
c    -(-b^{77, 13}_2 ∧  b^{77, 13}_1 ∧  b^{77, 13}_0 ∧ true) 
c  in CNF:
c     b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ false 
c  in DIMACS:
 18452 -18453 -18454  0
c  -3 does not represent an automaton state.
c    -( b^{77, 13}_2 ∧  b^{77, 13}_1 ∧  b^{77, 13}_0 ∧ true) 
c  in CNF:
c    -b^{77, 13}_2 ∨ -b^{77, 13}_1 ∨ -b^{77, 13}_0 ∨ false 
c  in DIMACS:
-18452 -18453 -18454  0

c i = 14
c  -2+1 --> -1
c    ( b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧  p_1078) -> ( b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0)
c  in CNF:
c    -b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨  b^{77, 15}_2
c    -b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_1
c    -b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨  b^{77, 15}_0
c  in DIMACS:
-18455 -18456  18457 -1078  18458 0
-18455 -18456  18457 -1078 -18459 0
-18455 -18456  18457 -1078  18460 0

c  -1+1 --> 0
c    ( b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0 ∧  p_1078) -> (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧ -b^{77, 15}_0)
c  in CNF:
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_2
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_1
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_0
c  in DIMACS:
-18455  18456 -18457 -1078 -18458 0
-18455  18456 -18457 -1078 -18459 0
-18455  18456 -18457 -1078 -18460 0

c  0+1 --> 1
c    (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧  p_1078) -> (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0)
c  in CNF:
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_2
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_1
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨  b^{77, 15}_0
c  in DIMACS:
 18455  18456  18457 -1078 -18458 0
 18455  18456  18457 -1078 -18459 0
 18455  18456  18457 -1078  18460 0

c  1+1 --> 2
c    (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0 ∧  p_1078) -> (-b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0)
c  in CNF:
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_2
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨  b^{77, 15}_1
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ -p_1078 ∨ -b^{77, 15}_0
c  in DIMACS:
 18455  18456 -18457 -1078 -18458 0
 18455  18456 -18457 -1078  18459 0
 18455  18456 -18457 -1078 -18460 0

c  2+1 --> break 
c    (-b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 18455 -18456  18457 -1078 1162 0


c  2-1 --> 1
c    (-b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧ -p_1078) -> (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0)
c  in CNF:
c     b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_2
c     b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_1
c     b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨  b^{77, 15}_0
c  in DIMACS:
 18455 -18456  18457  1078 -18458 0
 18455 -18456  18457  1078 -18459 0
 18455 -18456  18457  1078  18460 0

c  1-1 --> 0
c    (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0 ∧ -p_1078) -> (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧ -b^{77, 15}_0)
c  in CNF:
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_2
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_1
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_0
c  in DIMACS:
 18455  18456 -18457  1078 -18458 0
 18455  18456 -18457  1078 -18459 0
 18455  18456 -18457  1078 -18460 0

c  0-1 --> -1
c    (-b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧ -p_1078) -> ( b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0)
c  in CNF:
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨  b^{77, 15}_2
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_1
c     b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨  b^{77, 15}_0
c  in DIMACS:
 18455  18456  18457  1078  18458 0
 18455  18456  18457  1078 -18459 0
 18455  18456  18457  1078  18460 0

c  -1-1 --> -2
c    ( b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧  b^{77, 14}_0 ∧ -p_1078) -> ( b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0)
c  in CNF:
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨  b^{77, 15}_2
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨  b^{77, 15}_1
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨  p_1078 ∨ -b^{77, 15}_0
c  in DIMACS:
-18455  18456 -18457  1078  18458 0
-18455  18456 -18457  1078  18459 0
-18455  18456 -18457  1078 -18460 0

c  -2-1 --> break 
c    ( b^{77, 14}_2 ∧  b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨  b^{77, 14}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-18455 -18456  18457  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 14}_2 ∧ -b^{77, 14}_1 ∧ -b^{77, 14}_0 ∧ true) 
c  in CNF:
c    -b^{77, 14}_2 ∨  b^{77, 14}_1 ∨  b^{77, 14}_0 ∨ false 
c  in DIMACS:
-18455  18456  18457  0

c  3 does not represent an automaton state.
c    -(-b^{77, 14}_2 ∧  b^{77, 14}_1 ∧  b^{77, 14}_0 ∧ true) 
c  in CNF:
c     b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ false 
c  in DIMACS:
 18455 -18456 -18457  0
c  -3 does not represent an automaton state.
c    -( b^{77, 14}_2 ∧  b^{77, 14}_1 ∧  b^{77, 14}_0 ∧ true) 
c  in CNF:
c    -b^{77, 14}_2 ∨ -b^{77, 14}_1 ∨ -b^{77, 14}_0 ∨ false 
c  in DIMACS:
-18455 -18456 -18457  0

c i = 15
c  -2+1 --> -1
c    ( b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧  p_1155) -> ( b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧  b^{77, 16}_0)
c  in CNF:
c    -b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨  b^{77, 16}_2
c    -b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_1
c    -b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨  b^{77, 16}_0
c  in DIMACS:
-18458 -18459  18460 -1155  18461 0
-18458 -18459  18460 -1155 -18462 0
-18458 -18459  18460 -1155  18463 0

c  -1+1 --> 0
c    ( b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0 ∧  p_1155) -> (-b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧ -b^{77, 16}_0)
c  in CNF:
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_2
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_1
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_0
c  in DIMACS:
-18458  18459 -18460 -1155 -18461 0
-18458  18459 -18460 -1155 -18462 0
-18458  18459 -18460 -1155 -18463 0

c  0+1 --> 1
c    (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧  p_1155) -> (-b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧  b^{77, 16}_0)
c  in CNF:
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_2
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_1
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨  b^{77, 16}_0
c  in DIMACS:
 18458  18459  18460 -1155 -18461 0
 18458  18459  18460 -1155 -18462 0
 18458  18459  18460 -1155  18463 0

c  1+1 --> 2
c    (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0 ∧  p_1155) -> (-b^{77, 16}_2 ∧  b^{77, 16}_1 ∧ -b^{77, 16}_0)
c  in CNF:
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_2
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨  b^{77, 16}_1
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ -p_1155 ∨ -b^{77, 16}_0
c  in DIMACS:
 18458  18459 -18460 -1155 -18461 0
 18458  18459 -18460 -1155  18462 0
 18458  18459 -18460 -1155 -18463 0

c  2+1 --> break 
c    (-b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 18458 -18459  18460 -1155 1162 0


c  2-1 --> 1
c    (-b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧ -p_1155) -> (-b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧  b^{77, 16}_0)
c  in CNF:
c     b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_2
c     b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_1
c     b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨  b^{77, 16}_0
c  in DIMACS:
 18458 -18459  18460  1155 -18461 0
 18458 -18459  18460  1155 -18462 0
 18458 -18459  18460  1155  18463 0

c  1-1 --> 0
c    (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0 ∧ -p_1155) -> (-b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧ -b^{77, 16}_0)
c  in CNF:
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_2
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_1
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_0
c  in DIMACS:
 18458  18459 -18460  1155 -18461 0
 18458  18459 -18460  1155 -18462 0
 18458  18459 -18460  1155 -18463 0

c  0-1 --> -1
c    (-b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧ -p_1155) -> ( b^{77, 16}_2 ∧ -b^{77, 16}_1 ∧  b^{77, 16}_0)
c  in CNF:
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨  b^{77, 16}_2
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_1
c     b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨  b^{77, 16}_0
c  in DIMACS:
 18458  18459  18460  1155  18461 0
 18458  18459  18460  1155 -18462 0
 18458  18459  18460  1155  18463 0

c  -1-1 --> -2
c    ( b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧  b^{77, 15}_0 ∧ -p_1155) -> ( b^{77, 16}_2 ∧  b^{77, 16}_1 ∧ -b^{77, 16}_0)
c  in CNF:
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨  b^{77, 16}_2
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨  b^{77, 16}_1
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨  p_1155 ∨ -b^{77, 16}_0
c  in DIMACS:
-18458  18459 -18460  1155  18461 0
-18458  18459 -18460  1155  18462 0
-18458  18459 -18460  1155 -18463 0

c  -2-1 --> break 
c    ( b^{77, 15}_2 ∧  b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨  b^{77, 15}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-18458 -18459  18460  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{77, 15}_2 ∧ -b^{77, 15}_1 ∧ -b^{77, 15}_0 ∧ true) 
c  in CNF:
c    -b^{77, 15}_2 ∨  b^{77, 15}_1 ∨  b^{77, 15}_0 ∨ false 
c  in DIMACS:
-18458  18459  18460  0

c  3 does not represent an automaton state.
c    -(-b^{77, 15}_2 ∧  b^{77, 15}_1 ∧  b^{77, 15}_0 ∧ true) 
c  in CNF:
c     b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ false 
c  in DIMACS:
 18458 -18459 -18460  0
c  -3 does not represent an automaton state.
c    -( b^{77, 15}_2 ∧  b^{77, 15}_1 ∧  b^{77, 15}_0 ∧ true) 
c  in CNF:
c    -b^{77, 15}_2 ∨ -b^{77, 15}_1 ∨ -b^{77, 15}_0 ∨ false 
c  in DIMACS:
-18458 -18459 -18460  0

c INIT for k = 78
c    -b^{78, 1}_2
c    -b^{78, 1}_1
c    -b^{78, 1}_0
c  in DIMACS:
-18464 0
-18465 0
-18466 0

c Transitions for k = 78
c i = 1
c  -2+1 --> -1
c    ( b^{78, 1}_2 ∧  b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧  p_78) -> ( b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0)
c  in CNF:
c    -b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨  b^{78, 2}_2
c    -b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_1
c    -b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨  b^{78, 2}_0
c  in DIMACS:
-18464 -18465  18466 -78  18467 0
-18464 -18465  18466 -78 -18468 0
-18464 -18465  18466 -78  18469 0

c  -1+1 --> 0
c    ( b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧  b^{78, 1}_0 ∧  p_78) -> (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧ -b^{78, 2}_0)
c  in CNF:
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_2
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_1
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_0
c  in DIMACS:
-18464  18465 -18466 -78 -18467 0
-18464  18465 -18466 -78 -18468 0
-18464  18465 -18466 -78 -18469 0

c  0+1 --> 1
c    (-b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧  p_78) -> (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0)
c  in CNF:
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_2
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_1
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨  b^{78, 2}_0
c  in DIMACS:
 18464  18465  18466 -78 -18467 0
 18464  18465  18466 -78 -18468 0
 18464  18465  18466 -78  18469 0

c  1+1 --> 2
c    (-b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧  b^{78, 1}_0 ∧  p_78) -> (-b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0)
c  in CNF:
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_2
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨  b^{78, 2}_1
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ -p_78 ∨ -b^{78, 2}_0
c  in DIMACS:
 18464  18465 -18466 -78 -18467 0
 18464  18465 -18466 -78  18468 0
 18464  18465 -18466 -78 -18469 0

c  2+1 --> break 
c    (-b^{78, 1}_2 ∧  b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧  p_78) -> break
c  in CNF:
c     b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ -p_78 ∨ break
c  in DIMACS:
 18464 -18465  18466 -78 1162 0


c  2-1 --> 1
c    (-b^{78, 1}_2 ∧  b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧ -p_78) -> (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0)
c  in CNF:
c     b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_2
c     b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_1
c     b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨  b^{78, 2}_0
c  in DIMACS:
 18464 -18465  18466  78 -18467 0
 18464 -18465  18466  78 -18468 0
 18464 -18465  18466  78  18469 0

c  1-1 --> 0
c    (-b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧  b^{78, 1}_0 ∧ -p_78) -> (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧ -b^{78, 2}_0)
c  in CNF:
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_2
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_1
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_0
c  in DIMACS:
 18464  18465 -18466  78 -18467 0
 18464  18465 -18466  78 -18468 0
 18464  18465 -18466  78 -18469 0

c  0-1 --> -1
c    (-b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧ -p_78) -> ( b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0)
c  in CNF:
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨  b^{78, 2}_2
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_1
c     b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨  b^{78, 2}_0
c  in DIMACS:
 18464  18465  18466  78  18467 0
 18464  18465  18466  78 -18468 0
 18464  18465  18466  78  18469 0

c  -1-1 --> -2
c    ( b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧  b^{78, 1}_0 ∧ -p_78) -> ( b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0)
c  in CNF:
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨  b^{78, 2}_2
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨  b^{78, 2}_1
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨  p_78 ∨ -b^{78, 2}_0
c  in DIMACS:
-18464  18465 -18466  78  18467 0
-18464  18465 -18466  78  18468 0
-18464  18465 -18466  78 -18469 0

c  -2-1 --> break 
c    ( b^{78, 1}_2 ∧  b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧ -p_78) -> break
c  in CNF:
c    -b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨  b^{78, 1}_0 ∨  p_78 ∨ break
c  in DIMACS:
-18464 -18465  18466  78 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 1}_2 ∧ -b^{78, 1}_1 ∧ -b^{78, 1}_0 ∧ true) 
c  in CNF:
c    -b^{78, 1}_2 ∨  b^{78, 1}_1 ∨  b^{78, 1}_0 ∨ false 
c  in DIMACS:
-18464  18465  18466  0

c  3 does not represent an automaton state.
c    -(-b^{78, 1}_2 ∧  b^{78, 1}_1 ∧  b^{78, 1}_0 ∧ true) 
c  in CNF:
c     b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ false 
c  in DIMACS:
 18464 -18465 -18466  0
c  -3 does not represent an automaton state.
c    -( b^{78, 1}_2 ∧  b^{78, 1}_1 ∧  b^{78, 1}_0 ∧ true) 
c  in CNF:
c    -b^{78, 1}_2 ∨ -b^{78, 1}_1 ∨ -b^{78, 1}_0 ∨ false 
c  in DIMACS:
-18464 -18465 -18466  0

c i = 2
c  -2+1 --> -1
c    ( b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧  p_156) -> ( b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0)
c  in CNF:
c    -b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨  b^{78, 3}_2
c    -b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_1
c    -b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨  b^{78, 3}_0
c  in DIMACS:
-18467 -18468  18469 -156  18470 0
-18467 -18468  18469 -156 -18471 0
-18467 -18468  18469 -156  18472 0

c  -1+1 --> 0
c    ( b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0 ∧  p_156) -> (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧ -b^{78, 3}_0)
c  in CNF:
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_2
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_1
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_0
c  in DIMACS:
-18467  18468 -18469 -156 -18470 0
-18467  18468 -18469 -156 -18471 0
-18467  18468 -18469 -156 -18472 0

c  0+1 --> 1
c    (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧  p_156) -> (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0)
c  in CNF:
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_2
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_1
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨  b^{78, 3}_0
c  in DIMACS:
 18467  18468  18469 -156 -18470 0
 18467  18468  18469 -156 -18471 0
 18467  18468  18469 -156  18472 0

c  1+1 --> 2
c    (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0 ∧  p_156) -> (-b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0)
c  in CNF:
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_2
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨  b^{78, 3}_1
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ -p_156 ∨ -b^{78, 3}_0
c  in DIMACS:
 18467  18468 -18469 -156 -18470 0
 18467  18468 -18469 -156  18471 0
 18467  18468 -18469 -156 -18472 0

c  2+1 --> break 
c    (-b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧  p_156) -> break
c  in CNF:
c     b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 18467 -18468  18469 -156 1162 0


c  2-1 --> 1
c    (-b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧ -p_156) -> (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0)
c  in CNF:
c     b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_2
c     b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_1
c     b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨  b^{78, 3}_0
c  in DIMACS:
 18467 -18468  18469  156 -18470 0
 18467 -18468  18469  156 -18471 0
 18467 -18468  18469  156  18472 0

c  1-1 --> 0
c    (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0 ∧ -p_156) -> (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧ -b^{78, 3}_0)
c  in CNF:
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_2
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_1
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_0
c  in DIMACS:
 18467  18468 -18469  156 -18470 0
 18467  18468 -18469  156 -18471 0
 18467  18468 -18469  156 -18472 0

c  0-1 --> -1
c    (-b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧ -p_156) -> ( b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0)
c  in CNF:
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨  b^{78, 3}_2
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_1
c     b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨  b^{78, 3}_0
c  in DIMACS:
 18467  18468  18469  156  18470 0
 18467  18468  18469  156 -18471 0
 18467  18468  18469  156  18472 0

c  -1-1 --> -2
c    ( b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧  b^{78, 2}_0 ∧ -p_156) -> ( b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0)
c  in CNF:
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨  b^{78, 3}_2
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨  b^{78, 3}_1
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨  p_156 ∨ -b^{78, 3}_0
c  in DIMACS:
-18467  18468 -18469  156  18470 0
-18467  18468 -18469  156  18471 0
-18467  18468 -18469  156 -18472 0

c  -2-1 --> break 
c    ( b^{78, 2}_2 ∧  b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨  b^{78, 2}_0 ∨  p_156 ∨ break
c  in DIMACS:
-18467 -18468  18469  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 2}_2 ∧ -b^{78, 2}_1 ∧ -b^{78, 2}_0 ∧ true) 
c  in CNF:
c    -b^{78, 2}_2 ∨  b^{78, 2}_1 ∨  b^{78, 2}_0 ∨ false 
c  in DIMACS:
-18467  18468  18469  0

c  3 does not represent an automaton state.
c    -(-b^{78, 2}_2 ∧  b^{78, 2}_1 ∧  b^{78, 2}_0 ∧ true) 
c  in CNF:
c     b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ false 
c  in DIMACS:
 18467 -18468 -18469  0
c  -3 does not represent an automaton state.
c    -( b^{78, 2}_2 ∧  b^{78, 2}_1 ∧  b^{78, 2}_0 ∧ true) 
c  in CNF:
c    -b^{78, 2}_2 ∨ -b^{78, 2}_1 ∨ -b^{78, 2}_0 ∨ false 
c  in DIMACS:
-18467 -18468 -18469  0

c i = 3
c  -2+1 --> -1
c    ( b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧  p_234) -> ( b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0)
c  in CNF:
c    -b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨  b^{78, 4}_2
c    -b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_1
c    -b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨  b^{78, 4}_0
c  in DIMACS:
-18470 -18471  18472 -234  18473 0
-18470 -18471  18472 -234 -18474 0
-18470 -18471  18472 -234  18475 0

c  -1+1 --> 0
c    ( b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0 ∧  p_234) -> (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧ -b^{78, 4}_0)
c  in CNF:
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_2
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_1
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_0
c  in DIMACS:
-18470  18471 -18472 -234 -18473 0
-18470  18471 -18472 -234 -18474 0
-18470  18471 -18472 -234 -18475 0

c  0+1 --> 1
c    (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧  p_234) -> (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0)
c  in CNF:
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_2
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_1
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨  b^{78, 4}_0
c  in DIMACS:
 18470  18471  18472 -234 -18473 0
 18470  18471  18472 -234 -18474 0
 18470  18471  18472 -234  18475 0

c  1+1 --> 2
c    (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0 ∧  p_234) -> (-b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0)
c  in CNF:
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_2
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨  b^{78, 4}_1
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ -p_234 ∨ -b^{78, 4}_0
c  in DIMACS:
 18470  18471 -18472 -234 -18473 0
 18470  18471 -18472 -234  18474 0
 18470  18471 -18472 -234 -18475 0

c  2+1 --> break 
c    (-b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧  p_234) -> break
c  in CNF:
c     b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 18470 -18471  18472 -234 1162 0


c  2-1 --> 1
c    (-b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧ -p_234) -> (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0)
c  in CNF:
c     b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_2
c     b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_1
c     b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨  b^{78, 4}_0
c  in DIMACS:
 18470 -18471  18472  234 -18473 0
 18470 -18471  18472  234 -18474 0
 18470 -18471  18472  234  18475 0

c  1-1 --> 0
c    (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0 ∧ -p_234) -> (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧ -b^{78, 4}_0)
c  in CNF:
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_2
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_1
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_0
c  in DIMACS:
 18470  18471 -18472  234 -18473 0
 18470  18471 -18472  234 -18474 0
 18470  18471 -18472  234 -18475 0

c  0-1 --> -1
c    (-b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧ -p_234) -> ( b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0)
c  in CNF:
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨  b^{78, 4}_2
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_1
c     b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨  b^{78, 4}_0
c  in DIMACS:
 18470  18471  18472  234  18473 0
 18470  18471  18472  234 -18474 0
 18470  18471  18472  234  18475 0

c  -1-1 --> -2
c    ( b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧  b^{78, 3}_0 ∧ -p_234) -> ( b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0)
c  in CNF:
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨  b^{78, 4}_2
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨  b^{78, 4}_1
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨  p_234 ∨ -b^{78, 4}_0
c  in DIMACS:
-18470  18471 -18472  234  18473 0
-18470  18471 -18472  234  18474 0
-18470  18471 -18472  234 -18475 0

c  -2-1 --> break 
c    ( b^{78, 3}_2 ∧  b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨  b^{78, 3}_0 ∨  p_234 ∨ break
c  in DIMACS:
-18470 -18471  18472  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 3}_2 ∧ -b^{78, 3}_1 ∧ -b^{78, 3}_0 ∧ true) 
c  in CNF:
c    -b^{78, 3}_2 ∨  b^{78, 3}_1 ∨  b^{78, 3}_0 ∨ false 
c  in DIMACS:
-18470  18471  18472  0

c  3 does not represent an automaton state.
c    -(-b^{78, 3}_2 ∧  b^{78, 3}_1 ∧  b^{78, 3}_0 ∧ true) 
c  in CNF:
c     b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ false 
c  in DIMACS:
 18470 -18471 -18472  0
c  -3 does not represent an automaton state.
c    -( b^{78, 3}_2 ∧  b^{78, 3}_1 ∧  b^{78, 3}_0 ∧ true) 
c  in CNF:
c    -b^{78, 3}_2 ∨ -b^{78, 3}_1 ∨ -b^{78, 3}_0 ∨ false 
c  in DIMACS:
-18470 -18471 -18472  0

c i = 4
c  -2+1 --> -1
c    ( b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧  p_312) -> ( b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0)
c  in CNF:
c    -b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨  b^{78, 5}_2
c    -b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_1
c    -b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨  b^{78, 5}_0
c  in DIMACS:
-18473 -18474  18475 -312  18476 0
-18473 -18474  18475 -312 -18477 0
-18473 -18474  18475 -312  18478 0

c  -1+1 --> 0
c    ( b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0 ∧  p_312) -> (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧ -b^{78, 5}_0)
c  in CNF:
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_2
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_1
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_0
c  in DIMACS:
-18473  18474 -18475 -312 -18476 0
-18473  18474 -18475 -312 -18477 0
-18473  18474 -18475 -312 -18478 0

c  0+1 --> 1
c    (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧  p_312) -> (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0)
c  in CNF:
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_2
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_1
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨  b^{78, 5}_0
c  in DIMACS:
 18473  18474  18475 -312 -18476 0
 18473  18474  18475 -312 -18477 0
 18473  18474  18475 -312  18478 0

c  1+1 --> 2
c    (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0 ∧  p_312) -> (-b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0)
c  in CNF:
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_2
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨  b^{78, 5}_1
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ -p_312 ∨ -b^{78, 5}_0
c  in DIMACS:
 18473  18474 -18475 -312 -18476 0
 18473  18474 -18475 -312  18477 0
 18473  18474 -18475 -312 -18478 0

c  2+1 --> break 
c    (-b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧  p_312) -> break
c  in CNF:
c     b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 18473 -18474  18475 -312 1162 0


c  2-1 --> 1
c    (-b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧ -p_312) -> (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0)
c  in CNF:
c     b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_2
c     b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_1
c     b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨  b^{78, 5}_0
c  in DIMACS:
 18473 -18474  18475  312 -18476 0
 18473 -18474  18475  312 -18477 0
 18473 -18474  18475  312  18478 0

c  1-1 --> 0
c    (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0 ∧ -p_312) -> (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧ -b^{78, 5}_0)
c  in CNF:
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_2
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_1
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_0
c  in DIMACS:
 18473  18474 -18475  312 -18476 0
 18473  18474 -18475  312 -18477 0
 18473  18474 -18475  312 -18478 0

c  0-1 --> -1
c    (-b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧ -p_312) -> ( b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0)
c  in CNF:
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨  b^{78, 5}_2
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_1
c     b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨  b^{78, 5}_0
c  in DIMACS:
 18473  18474  18475  312  18476 0
 18473  18474  18475  312 -18477 0
 18473  18474  18475  312  18478 0

c  -1-1 --> -2
c    ( b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧  b^{78, 4}_0 ∧ -p_312) -> ( b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0)
c  in CNF:
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨  b^{78, 5}_2
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨  b^{78, 5}_1
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨  p_312 ∨ -b^{78, 5}_0
c  in DIMACS:
-18473  18474 -18475  312  18476 0
-18473  18474 -18475  312  18477 0
-18473  18474 -18475  312 -18478 0

c  -2-1 --> break 
c    ( b^{78, 4}_2 ∧  b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨  b^{78, 4}_0 ∨  p_312 ∨ break
c  in DIMACS:
-18473 -18474  18475  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 4}_2 ∧ -b^{78, 4}_1 ∧ -b^{78, 4}_0 ∧ true) 
c  in CNF:
c    -b^{78, 4}_2 ∨  b^{78, 4}_1 ∨  b^{78, 4}_0 ∨ false 
c  in DIMACS:
-18473  18474  18475  0

c  3 does not represent an automaton state.
c    -(-b^{78, 4}_2 ∧  b^{78, 4}_1 ∧  b^{78, 4}_0 ∧ true) 
c  in CNF:
c     b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ false 
c  in DIMACS:
 18473 -18474 -18475  0
c  -3 does not represent an automaton state.
c    -( b^{78, 4}_2 ∧  b^{78, 4}_1 ∧  b^{78, 4}_0 ∧ true) 
c  in CNF:
c    -b^{78, 4}_2 ∨ -b^{78, 4}_1 ∨ -b^{78, 4}_0 ∨ false 
c  in DIMACS:
-18473 -18474 -18475  0

c i = 5
c  -2+1 --> -1
c    ( b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧  p_390) -> ( b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0)
c  in CNF:
c    -b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨  b^{78, 6}_2
c    -b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_1
c    -b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨  b^{78, 6}_0
c  in DIMACS:
-18476 -18477  18478 -390  18479 0
-18476 -18477  18478 -390 -18480 0
-18476 -18477  18478 -390  18481 0

c  -1+1 --> 0
c    ( b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0 ∧  p_390) -> (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧ -b^{78, 6}_0)
c  in CNF:
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_2
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_1
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_0
c  in DIMACS:
-18476  18477 -18478 -390 -18479 0
-18476  18477 -18478 -390 -18480 0
-18476  18477 -18478 -390 -18481 0

c  0+1 --> 1
c    (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧  p_390) -> (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0)
c  in CNF:
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_2
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_1
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨  b^{78, 6}_0
c  in DIMACS:
 18476  18477  18478 -390 -18479 0
 18476  18477  18478 -390 -18480 0
 18476  18477  18478 -390  18481 0

c  1+1 --> 2
c    (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0 ∧  p_390) -> (-b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0)
c  in CNF:
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_2
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨  b^{78, 6}_1
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ -p_390 ∨ -b^{78, 6}_0
c  in DIMACS:
 18476  18477 -18478 -390 -18479 0
 18476  18477 -18478 -390  18480 0
 18476  18477 -18478 -390 -18481 0

c  2+1 --> break 
c    (-b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧  p_390) -> break
c  in CNF:
c     b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 18476 -18477  18478 -390 1162 0


c  2-1 --> 1
c    (-b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧ -p_390) -> (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0)
c  in CNF:
c     b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_2
c     b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_1
c     b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨  b^{78, 6}_0
c  in DIMACS:
 18476 -18477  18478  390 -18479 0
 18476 -18477  18478  390 -18480 0
 18476 -18477  18478  390  18481 0

c  1-1 --> 0
c    (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0 ∧ -p_390) -> (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧ -b^{78, 6}_0)
c  in CNF:
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_2
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_1
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_0
c  in DIMACS:
 18476  18477 -18478  390 -18479 0
 18476  18477 -18478  390 -18480 0
 18476  18477 -18478  390 -18481 0

c  0-1 --> -1
c    (-b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧ -p_390) -> ( b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0)
c  in CNF:
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨  b^{78, 6}_2
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_1
c     b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨  b^{78, 6}_0
c  in DIMACS:
 18476  18477  18478  390  18479 0
 18476  18477  18478  390 -18480 0
 18476  18477  18478  390  18481 0

c  -1-1 --> -2
c    ( b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧  b^{78, 5}_0 ∧ -p_390) -> ( b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0)
c  in CNF:
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨  b^{78, 6}_2
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨  b^{78, 6}_1
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨  p_390 ∨ -b^{78, 6}_0
c  in DIMACS:
-18476  18477 -18478  390  18479 0
-18476  18477 -18478  390  18480 0
-18476  18477 -18478  390 -18481 0

c  -2-1 --> break 
c    ( b^{78, 5}_2 ∧  b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨  b^{78, 5}_0 ∨  p_390 ∨ break
c  in DIMACS:
-18476 -18477  18478  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 5}_2 ∧ -b^{78, 5}_1 ∧ -b^{78, 5}_0 ∧ true) 
c  in CNF:
c    -b^{78, 5}_2 ∨  b^{78, 5}_1 ∨  b^{78, 5}_0 ∨ false 
c  in DIMACS:
-18476  18477  18478  0

c  3 does not represent an automaton state.
c    -(-b^{78, 5}_2 ∧  b^{78, 5}_1 ∧  b^{78, 5}_0 ∧ true) 
c  in CNF:
c     b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ false 
c  in DIMACS:
 18476 -18477 -18478  0
c  -3 does not represent an automaton state.
c    -( b^{78, 5}_2 ∧  b^{78, 5}_1 ∧  b^{78, 5}_0 ∧ true) 
c  in CNF:
c    -b^{78, 5}_2 ∨ -b^{78, 5}_1 ∨ -b^{78, 5}_0 ∨ false 
c  in DIMACS:
-18476 -18477 -18478  0

c i = 6
c  -2+1 --> -1
c    ( b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧  p_468) -> ( b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0)
c  in CNF:
c    -b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨  b^{78, 7}_2
c    -b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_1
c    -b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨  b^{78, 7}_0
c  in DIMACS:
-18479 -18480  18481 -468  18482 0
-18479 -18480  18481 -468 -18483 0
-18479 -18480  18481 -468  18484 0

c  -1+1 --> 0
c    ( b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0 ∧  p_468) -> (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧ -b^{78, 7}_0)
c  in CNF:
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_2
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_1
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_0
c  in DIMACS:
-18479  18480 -18481 -468 -18482 0
-18479  18480 -18481 -468 -18483 0
-18479  18480 -18481 -468 -18484 0

c  0+1 --> 1
c    (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧  p_468) -> (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0)
c  in CNF:
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_2
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_1
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨  b^{78, 7}_0
c  in DIMACS:
 18479  18480  18481 -468 -18482 0
 18479  18480  18481 -468 -18483 0
 18479  18480  18481 -468  18484 0

c  1+1 --> 2
c    (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0 ∧  p_468) -> (-b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0)
c  in CNF:
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_2
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨  b^{78, 7}_1
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ -p_468 ∨ -b^{78, 7}_0
c  in DIMACS:
 18479  18480 -18481 -468 -18482 0
 18479  18480 -18481 -468  18483 0
 18479  18480 -18481 -468 -18484 0

c  2+1 --> break 
c    (-b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧  p_468) -> break
c  in CNF:
c     b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 18479 -18480  18481 -468 1162 0


c  2-1 --> 1
c    (-b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧ -p_468) -> (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0)
c  in CNF:
c     b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_2
c     b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_1
c     b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨  b^{78, 7}_0
c  in DIMACS:
 18479 -18480  18481  468 -18482 0
 18479 -18480  18481  468 -18483 0
 18479 -18480  18481  468  18484 0

c  1-1 --> 0
c    (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0 ∧ -p_468) -> (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧ -b^{78, 7}_0)
c  in CNF:
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_2
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_1
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_0
c  in DIMACS:
 18479  18480 -18481  468 -18482 0
 18479  18480 -18481  468 -18483 0
 18479  18480 -18481  468 -18484 0

c  0-1 --> -1
c    (-b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧ -p_468) -> ( b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0)
c  in CNF:
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨  b^{78, 7}_2
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_1
c     b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨  b^{78, 7}_0
c  in DIMACS:
 18479  18480  18481  468  18482 0
 18479  18480  18481  468 -18483 0
 18479  18480  18481  468  18484 0

c  -1-1 --> -2
c    ( b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧  b^{78, 6}_0 ∧ -p_468) -> ( b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0)
c  in CNF:
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨  b^{78, 7}_2
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨  b^{78, 7}_1
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨  p_468 ∨ -b^{78, 7}_0
c  in DIMACS:
-18479  18480 -18481  468  18482 0
-18479  18480 -18481  468  18483 0
-18479  18480 -18481  468 -18484 0

c  -2-1 --> break 
c    ( b^{78, 6}_2 ∧  b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨  b^{78, 6}_0 ∨  p_468 ∨ break
c  in DIMACS:
-18479 -18480  18481  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 6}_2 ∧ -b^{78, 6}_1 ∧ -b^{78, 6}_0 ∧ true) 
c  in CNF:
c    -b^{78, 6}_2 ∨  b^{78, 6}_1 ∨  b^{78, 6}_0 ∨ false 
c  in DIMACS:
-18479  18480  18481  0

c  3 does not represent an automaton state.
c    -(-b^{78, 6}_2 ∧  b^{78, 6}_1 ∧  b^{78, 6}_0 ∧ true) 
c  in CNF:
c     b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ false 
c  in DIMACS:
 18479 -18480 -18481  0
c  -3 does not represent an automaton state.
c    -( b^{78, 6}_2 ∧  b^{78, 6}_1 ∧  b^{78, 6}_0 ∧ true) 
c  in CNF:
c    -b^{78, 6}_2 ∨ -b^{78, 6}_1 ∨ -b^{78, 6}_0 ∨ false 
c  in DIMACS:
-18479 -18480 -18481  0

c i = 7
c  -2+1 --> -1
c    ( b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧  p_546) -> ( b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0)
c  in CNF:
c    -b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨  b^{78, 8}_2
c    -b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_1
c    -b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨  b^{78, 8}_0
c  in DIMACS:
-18482 -18483  18484 -546  18485 0
-18482 -18483  18484 -546 -18486 0
-18482 -18483  18484 -546  18487 0

c  -1+1 --> 0
c    ( b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0 ∧  p_546) -> (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧ -b^{78, 8}_0)
c  in CNF:
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_2
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_1
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_0
c  in DIMACS:
-18482  18483 -18484 -546 -18485 0
-18482  18483 -18484 -546 -18486 0
-18482  18483 -18484 -546 -18487 0

c  0+1 --> 1
c    (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧  p_546) -> (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0)
c  in CNF:
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_2
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_1
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨  b^{78, 8}_0
c  in DIMACS:
 18482  18483  18484 -546 -18485 0
 18482  18483  18484 -546 -18486 0
 18482  18483  18484 -546  18487 0

c  1+1 --> 2
c    (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0 ∧  p_546) -> (-b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0)
c  in CNF:
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_2
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨  b^{78, 8}_1
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ -p_546 ∨ -b^{78, 8}_0
c  in DIMACS:
 18482  18483 -18484 -546 -18485 0
 18482  18483 -18484 -546  18486 0
 18482  18483 -18484 -546 -18487 0

c  2+1 --> break 
c    (-b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧  p_546) -> break
c  in CNF:
c     b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 18482 -18483  18484 -546 1162 0


c  2-1 --> 1
c    (-b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧ -p_546) -> (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0)
c  in CNF:
c     b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_2
c     b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_1
c     b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨  b^{78, 8}_0
c  in DIMACS:
 18482 -18483  18484  546 -18485 0
 18482 -18483  18484  546 -18486 0
 18482 -18483  18484  546  18487 0

c  1-1 --> 0
c    (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0 ∧ -p_546) -> (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧ -b^{78, 8}_0)
c  in CNF:
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_2
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_1
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_0
c  in DIMACS:
 18482  18483 -18484  546 -18485 0
 18482  18483 -18484  546 -18486 0
 18482  18483 -18484  546 -18487 0

c  0-1 --> -1
c    (-b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧ -p_546) -> ( b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0)
c  in CNF:
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨  b^{78, 8}_2
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_1
c     b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨  b^{78, 8}_0
c  in DIMACS:
 18482  18483  18484  546  18485 0
 18482  18483  18484  546 -18486 0
 18482  18483  18484  546  18487 0

c  -1-1 --> -2
c    ( b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧  b^{78, 7}_0 ∧ -p_546) -> ( b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0)
c  in CNF:
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨  b^{78, 8}_2
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨  b^{78, 8}_1
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨  p_546 ∨ -b^{78, 8}_0
c  in DIMACS:
-18482  18483 -18484  546  18485 0
-18482  18483 -18484  546  18486 0
-18482  18483 -18484  546 -18487 0

c  -2-1 --> break 
c    ( b^{78, 7}_2 ∧  b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨  b^{78, 7}_0 ∨  p_546 ∨ break
c  in DIMACS:
-18482 -18483  18484  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 7}_2 ∧ -b^{78, 7}_1 ∧ -b^{78, 7}_0 ∧ true) 
c  in CNF:
c    -b^{78, 7}_2 ∨  b^{78, 7}_1 ∨  b^{78, 7}_0 ∨ false 
c  in DIMACS:
-18482  18483  18484  0

c  3 does not represent an automaton state.
c    -(-b^{78, 7}_2 ∧  b^{78, 7}_1 ∧  b^{78, 7}_0 ∧ true) 
c  in CNF:
c     b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ false 
c  in DIMACS:
 18482 -18483 -18484  0
c  -3 does not represent an automaton state.
c    -( b^{78, 7}_2 ∧  b^{78, 7}_1 ∧  b^{78, 7}_0 ∧ true) 
c  in CNF:
c    -b^{78, 7}_2 ∨ -b^{78, 7}_1 ∨ -b^{78, 7}_0 ∨ false 
c  in DIMACS:
-18482 -18483 -18484  0

c i = 8
c  -2+1 --> -1
c    ( b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧  p_624) -> ( b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0)
c  in CNF:
c    -b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨  b^{78, 9}_2
c    -b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_1
c    -b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨  b^{78, 9}_0
c  in DIMACS:
-18485 -18486  18487 -624  18488 0
-18485 -18486  18487 -624 -18489 0
-18485 -18486  18487 -624  18490 0

c  -1+1 --> 0
c    ( b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0 ∧  p_624) -> (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧ -b^{78, 9}_0)
c  in CNF:
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_2
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_1
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_0
c  in DIMACS:
-18485  18486 -18487 -624 -18488 0
-18485  18486 -18487 -624 -18489 0
-18485  18486 -18487 -624 -18490 0

c  0+1 --> 1
c    (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧  p_624) -> (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0)
c  in CNF:
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_2
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_1
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨  b^{78, 9}_0
c  in DIMACS:
 18485  18486  18487 -624 -18488 0
 18485  18486  18487 -624 -18489 0
 18485  18486  18487 -624  18490 0

c  1+1 --> 2
c    (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0 ∧  p_624) -> (-b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0)
c  in CNF:
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_2
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨  b^{78, 9}_1
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ -p_624 ∨ -b^{78, 9}_0
c  in DIMACS:
 18485  18486 -18487 -624 -18488 0
 18485  18486 -18487 -624  18489 0
 18485  18486 -18487 -624 -18490 0

c  2+1 --> break 
c    (-b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧  p_624) -> break
c  in CNF:
c     b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 18485 -18486  18487 -624 1162 0


c  2-1 --> 1
c    (-b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧ -p_624) -> (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0)
c  in CNF:
c     b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_2
c     b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_1
c     b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨  b^{78, 9}_0
c  in DIMACS:
 18485 -18486  18487  624 -18488 0
 18485 -18486  18487  624 -18489 0
 18485 -18486  18487  624  18490 0

c  1-1 --> 0
c    (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0 ∧ -p_624) -> (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧ -b^{78, 9}_0)
c  in CNF:
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_2
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_1
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_0
c  in DIMACS:
 18485  18486 -18487  624 -18488 0
 18485  18486 -18487  624 -18489 0
 18485  18486 -18487  624 -18490 0

c  0-1 --> -1
c    (-b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧ -p_624) -> ( b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0)
c  in CNF:
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨  b^{78, 9}_2
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_1
c     b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨  b^{78, 9}_0
c  in DIMACS:
 18485  18486  18487  624  18488 0
 18485  18486  18487  624 -18489 0
 18485  18486  18487  624  18490 0

c  -1-1 --> -2
c    ( b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧  b^{78, 8}_0 ∧ -p_624) -> ( b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0)
c  in CNF:
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨  b^{78, 9}_2
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨  b^{78, 9}_1
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨  p_624 ∨ -b^{78, 9}_0
c  in DIMACS:
-18485  18486 -18487  624  18488 0
-18485  18486 -18487  624  18489 0
-18485  18486 -18487  624 -18490 0

c  -2-1 --> break 
c    ( b^{78, 8}_2 ∧  b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨  b^{78, 8}_0 ∨  p_624 ∨ break
c  in DIMACS:
-18485 -18486  18487  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 8}_2 ∧ -b^{78, 8}_1 ∧ -b^{78, 8}_0 ∧ true) 
c  in CNF:
c    -b^{78, 8}_2 ∨  b^{78, 8}_1 ∨  b^{78, 8}_0 ∨ false 
c  in DIMACS:
-18485  18486  18487  0

c  3 does not represent an automaton state.
c    -(-b^{78, 8}_2 ∧  b^{78, 8}_1 ∧  b^{78, 8}_0 ∧ true) 
c  in CNF:
c     b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ false 
c  in DIMACS:
 18485 -18486 -18487  0
c  -3 does not represent an automaton state.
c    -( b^{78, 8}_2 ∧  b^{78, 8}_1 ∧  b^{78, 8}_0 ∧ true) 
c  in CNF:
c    -b^{78, 8}_2 ∨ -b^{78, 8}_1 ∨ -b^{78, 8}_0 ∨ false 
c  in DIMACS:
-18485 -18486 -18487  0

c i = 9
c  -2+1 --> -1
c    ( b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧  p_702) -> ( b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0)
c  in CNF:
c    -b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨  b^{78, 10}_2
c    -b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_1
c    -b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨  b^{78, 10}_0
c  in DIMACS:
-18488 -18489  18490 -702  18491 0
-18488 -18489  18490 -702 -18492 0
-18488 -18489  18490 -702  18493 0

c  -1+1 --> 0
c    ( b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0 ∧  p_702) -> (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧ -b^{78, 10}_0)
c  in CNF:
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_2
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_1
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_0
c  in DIMACS:
-18488  18489 -18490 -702 -18491 0
-18488  18489 -18490 -702 -18492 0
-18488  18489 -18490 -702 -18493 0

c  0+1 --> 1
c    (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧  p_702) -> (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0)
c  in CNF:
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_2
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_1
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨  b^{78, 10}_0
c  in DIMACS:
 18488  18489  18490 -702 -18491 0
 18488  18489  18490 -702 -18492 0
 18488  18489  18490 -702  18493 0

c  1+1 --> 2
c    (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0 ∧  p_702) -> (-b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0)
c  in CNF:
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_2
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨  b^{78, 10}_1
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ -p_702 ∨ -b^{78, 10}_0
c  in DIMACS:
 18488  18489 -18490 -702 -18491 0
 18488  18489 -18490 -702  18492 0
 18488  18489 -18490 -702 -18493 0

c  2+1 --> break 
c    (-b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧  p_702) -> break
c  in CNF:
c     b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 18488 -18489  18490 -702 1162 0


c  2-1 --> 1
c    (-b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧ -p_702) -> (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0)
c  in CNF:
c     b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_2
c     b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_1
c     b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨  b^{78, 10}_0
c  in DIMACS:
 18488 -18489  18490  702 -18491 0
 18488 -18489  18490  702 -18492 0
 18488 -18489  18490  702  18493 0

c  1-1 --> 0
c    (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0 ∧ -p_702) -> (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧ -b^{78, 10}_0)
c  in CNF:
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_2
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_1
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_0
c  in DIMACS:
 18488  18489 -18490  702 -18491 0
 18488  18489 -18490  702 -18492 0
 18488  18489 -18490  702 -18493 0

c  0-1 --> -1
c    (-b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧ -p_702) -> ( b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0)
c  in CNF:
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨  b^{78, 10}_2
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_1
c     b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨  b^{78, 10}_0
c  in DIMACS:
 18488  18489  18490  702  18491 0
 18488  18489  18490  702 -18492 0
 18488  18489  18490  702  18493 0

c  -1-1 --> -2
c    ( b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧  b^{78, 9}_0 ∧ -p_702) -> ( b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0)
c  in CNF:
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨  b^{78, 10}_2
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨  b^{78, 10}_1
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨  p_702 ∨ -b^{78, 10}_0
c  in DIMACS:
-18488  18489 -18490  702  18491 0
-18488  18489 -18490  702  18492 0
-18488  18489 -18490  702 -18493 0

c  -2-1 --> break 
c    ( b^{78, 9}_2 ∧  b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨  b^{78, 9}_0 ∨  p_702 ∨ break
c  in DIMACS:
-18488 -18489  18490  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 9}_2 ∧ -b^{78, 9}_1 ∧ -b^{78, 9}_0 ∧ true) 
c  in CNF:
c    -b^{78, 9}_2 ∨  b^{78, 9}_1 ∨  b^{78, 9}_0 ∨ false 
c  in DIMACS:
-18488  18489  18490  0

c  3 does not represent an automaton state.
c    -(-b^{78, 9}_2 ∧  b^{78, 9}_1 ∧  b^{78, 9}_0 ∧ true) 
c  in CNF:
c     b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ false 
c  in DIMACS:
 18488 -18489 -18490  0
c  -3 does not represent an automaton state.
c    -( b^{78, 9}_2 ∧  b^{78, 9}_1 ∧  b^{78, 9}_0 ∧ true) 
c  in CNF:
c    -b^{78, 9}_2 ∨ -b^{78, 9}_1 ∨ -b^{78, 9}_0 ∨ false 
c  in DIMACS:
-18488 -18489 -18490  0

c i = 10
c  -2+1 --> -1
c    ( b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧  p_780) -> ( b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0)
c  in CNF:
c    -b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨  b^{78, 11}_2
c    -b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_1
c    -b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨  b^{78, 11}_0
c  in DIMACS:
-18491 -18492  18493 -780  18494 0
-18491 -18492  18493 -780 -18495 0
-18491 -18492  18493 -780  18496 0

c  -1+1 --> 0
c    ( b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0 ∧  p_780) -> (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧ -b^{78, 11}_0)
c  in CNF:
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_2
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_1
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_0
c  in DIMACS:
-18491  18492 -18493 -780 -18494 0
-18491  18492 -18493 -780 -18495 0
-18491  18492 -18493 -780 -18496 0

c  0+1 --> 1
c    (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧  p_780) -> (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0)
c  in CNF:
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_2
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_1
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨  b^{78, 11}_0
c  in DIMACS:
 18491  18492  18493 -780 -18494 0
 18491  18492  18493 -780 -18495 0
 18491  18492  18493 -780  18496 0

c  1+1 --> 2
c    (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0 ∧  p_780) -> (-b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0)
c  in CNF:
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_2
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨  b^{78, 11}_1
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ -p_780 ∨ -b^{78, 11}_0
c  in DIMACS:
 18491  18492 -18493 -780 -18494 0
 18491  18492 -18493 -780  18495 0
 18491  18492 -18493 -780 -18496 0

c  2+1 --> break 
c    (-b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧  p_780) -> break
c  in CNF:
c     b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 18491 -18492  18493 -780 1162 0


c  2-1 --> 1
c    (-b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧ -p_780) -> (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0)
c  in CNF:
c     b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_2
c     b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_1
c     b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨  b^{78, 11}_0
c  in DIMACS:
 18491 -18492  18493  780 -18494 0
 18491 -18492  18493  780 -18495 0
 18491 -18492  18493  780  18496 0

c  1-1 --> 0
c    (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0 ∧ -p_780) -> (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧ -b^{78, 11}_0)
c  in CNF:
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_2
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_1
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_0
c  in DIMACS:
 18491  18492 -18493  780 -18494 0
 18491  18492 -18493  780 -18495 0
 18491  18492 -18493  780 -18496 0

c  0-1 --> -1
c    (-b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧ -p_780) -> ( b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0)
c  in CNF:
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨  b^{78, 11}_2
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_1
c     b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨  b^{78, 11}_0
c  in DIMACS:
 18491  18492  18493  780  18494 0
 18491  18492  18493  780 -18495 0
 18491  18492  18493  780  18496 0

c  -1-1 --> -2
c    ( b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧  b^{78, 10}_0 ∧ -p_780) -> ( b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0)
c  in CNF:
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨  b^{78, 11}_2
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨  b^{78, 11}_1
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨  p_780 ∨ -b^{78, 11}_0
c  in DIMACS:
-18491  18492 -18493  780  18494 0
-18491  18492 -18493  780  18495 0
-18491  18492 -18493  780 -18496 0

c  -2-1 --> break 
c    ( b^{78, 10}_2 ∧  b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨  b^{78, 10}_0 ∨  p_780 ∨ break
c  in DIMACS:
-18491 -18492  18493  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 10}_2 ∧ -b^{78, 10}_1 ∧ -b^{78, 10}_0 ∧ true) 
c  in CNF:
c    -b^{78, 10}_2 ∨  b^{78, 10}_1 ∨  b^{78, 10}_0 ∨ false 
c  in DIMACS:
-18491  18492  18493  0

c  3 does not represent an automaton state.
c    -(-b^{78, 10}_2 ∧  b^{78, 10}_1 ∧  b^{78, 10}_0 ∧ true) 
c  in CNF:
c     b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ false 
c  in DIMACS:
 18491 -18492 -18493  0
c  -3 does not represent an automaton state.
c    -( b^{78, 10}_2 ∧  b^{78, 10}_1 ∧  b^{78, 10}_0 ∧ true) 
c  in CNF:
c    -b^{78, 10}_2 ∨ -b^{78, 10}_1 ∨ -b^{78, 10}_0 ∨ false 
c  in DIMACS:
-18491 -18492 -18493  0

c i = 11
c  -2+1 --> -1
c    ( b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧  p_858) -> ( b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0)
c  in CNF:
c    -b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨  b^{78, 12}_2
c    -b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_1
c    -b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨  b^{78, 12}_0
c  in DIMACS:
-18494 -18495  18496 -858  18497 0
-18494 -18495  18496 -858 -18498 0
-18494 -18495  18496 -858  18499 0

c  -1+1 --> 0
c    ( b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0 ∧  p_858) -> (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧ -b^{78, 12}_0)
c  in CNF:
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_2
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_1
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_0
c  in DIMACS:
-18494  18495 -18496 -858 -18497 0
-18494  18495 -18496 -858 -18498 0
-18494  18495 -18496 -858 -18499 0

c  0+1 --> 1
c    (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧  p_858) -> (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0)
c  in CNF:
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_2
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_1
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨  b^{78, 12}_0
c  in DIMACS:
 18494  18495  18496 -858 -18497 0
 18494  18495  18496 -858 -18498 0
 18494  18495  18496 -858  18499 0

c  1+1 --> 2
c    (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0 ∧  p_858) -> (-b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0)
c  in CNF:
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_2
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨  b^{78, 12}_1
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ -p_858 ∨ -b^{78, 12}_0
c  in DIMACS:
 18494  18495 -18496 -858 -18497 0
 18494  18495 -18496 -858  18498 0
 18494  18495 -18496 -858 -18499 0

c  2+1 --> break 
c    (-b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧  p_858) -> break
c  in CNF:
c     b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 18494 -18495  18496 -858 1162 0


c  2-1 --> 1
c    (-b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧ -p_858) -> (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0)
c  in CNF:
c     b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_2
c     b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_1
c     b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨  b^{78, 12}_0
c  in DIMACS:
 18494 -18495  18496  858 -18497 0
 18494 -18495  18496  858 -18498 0
 18494 -18495  18496  858  18499 0

c  1-1 --> 0
c    (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0 ∧ -p_858) -> (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧ -b^{78, 12}_0)
c  in CNF:
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_2
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_1
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_0
c  in DIMACS:
 18494  18495 -18496  858 -18497 0
 18494  18495 -18496  858 -18498 0
 18494  18495 -18496  858 -18499 0

c  0-1 --> -1
c    (-b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧ -p_858) -> ( b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0)
c  in CNF:
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨  b^{78, 12}_2
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_1
c     b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨  b^{78, 12}_0
c  in DIMACS:
 18494  18495  18496  858  18497 0
 18494  18495  18496  858 -18498 0
 18494  18495  18496  858  18499 0

c  -1-1 --> -2
c    ( b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧  b^{78, 11}_0 ∧ -p_858) -> ( b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0)
c  in CNF:
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨  b^{78, 12}_2
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨  b^{78, 12}_1
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨  p_858 ∨ -b^{78, 12}_0
c  in DIMACS:
-18494  18495 -18496  858  18497 0
-18494  18495 -18496  858  18498 0
-18494  18495 -18496  858 -18499 0

c  -2-1 --> break 
c    ( b^{78, 11}_2 ∧  b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨  b^{78, 11}_0 ∨  p_858 ∨ break
c  in DIMACS:
-18494 -18495  18496  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 11}_2 ∧ -b^{78, 11}_1 ∧ -b^{78, 11}_0 ∧ true) 
c  in CNF:
c    -b^{78, 11}_2 ∨  b^{78, 11}_1 ∨  b^{78, 11}_0 ∨ false 
c  in DIMACS:
-18494  18495  18496  0

c  3 does not represent an automaton state.
c    -(-b^{78, 11}_2 ∧  b^{78, 11}_1 ∧  b^{78, 11}_0 ∧ true) 
c  in CNF:
c     b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ false 
c  in DIMACS:
 18494 -18495 -18496  0
c  -3 does not represent an automaton state.
c    -( b^{78, 11}_2 ∧  b^{78, 11}_1 ∧  b^{78, 11}_0 ∧ true) 
c  in CNF:
c    -b^{78, 11}_2 ∨ -b^{78, 11}_1 ∨ -b^{78, 11}_0 ∨ false 
c  in DIMACS:
-18494 -18495 -18496  0

c i = 12
c  -2+1 --> -1
c    ( b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧  p_936) -> ( b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0)
c  in CNF:
c    -b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨  b^{78, 13}_2
c    -b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_1
c    -b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨  b^{78, 13}_0
c  in DIMACS:
-18497 -18498  18499 -936  18500 0
-18497 -18498  18499 -936 -18501 0
-18497 -18498  18499 -936  18502 0

c  -1+1 --> 0
c    ( b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0 ∧  p_936) -> (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧ -b^{78, 13}_0)
c  in CNF:
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_2
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_1
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_0
c  in DIMACS:
-18497  18498 -18499 -936 -18500 0
-18497  18498 -18499 -936 -18501 0
-18497  18498 -18499 -936 -18502 0

c  0+1 --> 1
c    (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧  p_936) -> (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0)
c  in CNF:
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_2
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_1
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨  b^{78, 13}_0
c  in DIMACS:
 18497  18498  18499 -936 -18500 0
 18497  18498  18499 -936 -18501 0
 18497  18498  18499 -936  18502 0

c  1+1 --> 2
c    (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0 ∧  p_936) -> (-b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0)
c  in CNF:
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_2
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨  b^{78, 13}_1
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ -p_936 ∨ -b^{78, 13}_0
c  in DIMACS:
 18497  18498 -18499 -936 -18500 0
 18497  18498 -18499 -936  18501 0
 18497  18498 -18499 -936 -18502 0

c  2+1 --> break 
c    (-b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧  p_936) -> break
c  in CNF:
c     b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 18497 -18498  18499 -936 1162 0


c  2-1 --> 1
c    (-b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧ -p_936) -> (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0)
c  in CNF:
c     b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_2
c     b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_1
c     b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨  b^{78, 13}_0
c  in DIMACS:
 18497 -18498  18499  936 -18500 0
 18497 -18498  18499  936 -18501 0
 18497 -18498  18499  936  18502 0

c  1-1 --> 0
c    (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0 ∧ -p_936) -> (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧ -b^{78, 13}_0)
c  in CNF:
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_2
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_1
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_0
c  in DIMACS:
 18497  18498 -18499  936 -18500 0
 18497  18498 -18499  936 -18501 0
 18497  18498 -18499  936 -18502 0

c  0-1 --> -1
c    (-b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧ -p_936) -> ( b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0)
c  in CNF:
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨  b^{78, 13}_2
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_1
c     b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨  b^{78, 13}_0
c  in DIMACS:
 18497  18498  18499  936  18500 0
 18497  18498  18499  936 -18501 0
 18497  18498  18499  936  18502 0

c  -1-1 --> -2
c    ( b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧  b^{78, 12}_0 ∧ -p_936) -> ( b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0)
c  in CNF:
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨  b^{78, 13}_2
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨  b^{78, 13}_1
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨  p_936 ∨ -b^{78, 13}_0
c  in DIMACS:
-18497  18498 -18499  936  18500 0
-18497  18498 -18499  936  18501 0
-18497  18498 -18499  936 -18502 0

c  -2-1 --> break 
c    ( b^{78, 12}_2 ∧  b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨  b^{78, 12}_0 ∨  p_936 ∨ break
c  in DIMACS:
-18497 -18498  18499  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 12}_2 ∧ -b^{78, 12}_1 ∧ -b^{78, 12}_0 ∧ true) 
c  in CNF:
c    -b^{78, 12}_2 ∨  b^{78, 12}_1 ∨  b^{78, 12}_0 ∨ false 
c  in DIMACS:
-18497  18498  18499  0

c  3 does not represent an automaton state.
c    -(-b^{78, 12}_2 ∧  b^{78, 12}_1 ∧  b^{78, 12}_0 ∧ true) 
c  in CNF:
c     b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ false 
c  in DIMACS:
 18497 -18498 -18499  0
c  -3 does not represent an automaton state.
c    -( b^{78, 12}_2 ∧  b^{78, 12}_1 ∧  b^{78, 12}_0 ∧ true) 
c  in CNF:
c    -b^{78, 12}_2 ∨ -b^{78, 12}_1 ∨ -b^{78, 12}_0 ∨ false 
c  in DIMACS:
-18497 -18498 -18499  0

c i = 13
c  -2+1 --> -1
c    ( b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧  p_1014) -> ( b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0)
c  in CNF:
c    -b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨  b^{78, 14}_2
c    -b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_1
c    -b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨  b^{78, 14}_0
c  in DIMACS:
-18500 -18501  18502 -1014  18503 0
-18500 -18501  18502 -1014 -18504 0
-18500 -18501  18502 -1014  18505 0

c  -1+1 --> 0
c    ( b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0 ∧  p_1014) -> (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧ -b^{78, 14}_0)
c  in CNF:
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_2
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_1
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_0
c  in DIMACS:
-18500  18501 -18502 -1014 -18503 0
-18500  18501 -18502 -1014 -18504 0
-18500  18501 -18502 -1014 -18505 0

c  0+1 --> 1
c    (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧  p_1014) -> (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0)
c  in CNF:
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_2
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_1
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨  b^{78, 14}_0
c  in DIMACS:
 18500  18501  18502 -1014 -18503 0
 18500  18501  18502 -1014 -18504 0
 18500  18501  18502 -1014  18505 0

c  1+1 --> 2
c    (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0 ∧  p_1014) -> (-b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0)
c  in CNF:
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_2
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨  b^{78, 14}_1
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ -p_1014 ∨ -b^{78, 14}_0
c  in DIMACS:
 18500  18501 -18502 -1014 -18503 0
 18500  18501 -18502 -1014  18504 0
 18500  18501 -18502 -1014 -18505 0

c  2+1 --> break 
c    (-b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 18500 -18501  18502 -1014 1162 0


c  2-1 --> 1
c    (-b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧ -p_1014) -> (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0)
c  in CNF:
c     b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_2
c     b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_1
c     b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨  b^{78, 14}_0
c  in DIMACS:
 18500 -18501  18502  1014 -18503 0
 18500 -18501  18502  1014 -18504 0
 18500 -18501  18502  1014  18505 0

c  1-1 --> 0
c    (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0 ∧ -p_1014) -> (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧ -b^{78, 14}_0)
c  in CNF:
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_2
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_1
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_0
c  in DIMACS:
 18500  18501 -18502  1014 -18503 0
 18500  18501 -18502  1014 -18504 0
 18500  18501 -18502  1014 -18505 0

c  0-1 --> -1
c    (-b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧ -p_1014) -> ( b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0)
c  in CNF:
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨  b^{78, 14}_2
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_1
c     b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨  b^{78, 14}_0
c  in DIMACS:
 18500  18501  18502  1014  18503 0
 18500  18501  18502  1014 -18504 0
 18500  18501  18502  1014  18505 0

c  -1-1 --> -2
c    ( b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧  b^{78, 13}_0 ∧ -p_1014) -> ( b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0)
c  in CNF:
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨  b^{78, 14}_2
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨  b^{78, 14}_1
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨  p_1014 ∨ -b^{78, 14}_0
c  in DIMACS:
-18500  18501 -18502  1014  18503 0
-18500  18501 -18502  1014  18504 0
-18500  18501 -18502  1014 -18505 0

c  -2-1 --> break 
c    ( b^{78, 13}_2 ∧  b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨  b^{78, 13}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-18500 -18501  18502  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 13}_2 ∧ -b^{78, 13}_1 ∧ -b^{78, 13}_0 ∧ true) 
c  in CNF:
c    -b^{78, 13}_2 ∨  b^{78, 13}_1 ∨  b^{78, 13}_0 ∨ false 
c  in DIMACS:
-18500  18501  18502  0

c  3 does not represent an automaton state.
c    -(-b^{78, 13}_2 ∧  b^{78, 13}_1 ∧  b^{78, 13}_0 ∧ true) 
c  in CNF:
c     b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ false 
c  in DIMACS:
 18500 -18501 -18502  0
c  -3 does not represent an automaton state.
c    -( b^{78, 13}_2 ∧  b^{78, 13}_1 ∧  b^{78, 13}_0 ∧ true) 
c  in CNF:
c    -b^{78, 13}_2 ∨ -b^{78, 13}_1 ∨ -b^{78, 13}_0 ∨ false 
c  in DIMACS:
-18500 -18501 -18502  0

c i = 14
c  -2+1 --> -1
c    ( b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧  p_1092) -> ( b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧  b^{78, 15}_0)
c  in CNF:
c    -b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨  b^{78, 15}_2
c    -b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_1
c    -b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨  b^{78, 15}_0
c  in DIMACS:
-18503 -18504  18505 -1092  18506 0
-18503 -18504  18505 -1092 -18507 0
-18503 -18504  18505 -1092  18508 0

c  -1+1 --> 0
c    ( b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0 ∧  p_1092) -> (-b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧ -b^{78, 15}_0)
c  in CNF:
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_2
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_1
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_0
c  in DIMACS:
-18503  18504 -18505 -1092 -18506 0
-18503  18504 -18505 -1092 -18507 0
-18503  18504 -18505 -1092 -18508 0

c  0+1 --> 1
c    (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧  p_1092) -> (-b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧  b^{78, 15}_0)
c  in CNF:
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_2
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_1
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨  b^{78, 15}_0
c  in DIMACS:
 18503  18504  18505 -1092 -18506 0
 18503  18504  18505 -1092 -18507 0
 18503  18504  18505 -1092  18508 0

c  1+1 --> 2
c    (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0 ∧  p_1092) -> (-b^{78, 15}_2 ∧  b^{78, 15}_1 ∧ -b^{78, 15}_0)
c  in CNF:
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_2
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨  b^{78, 15}_1
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ -p_1092 ∨ -b^{78, 15}_0
c  in DIMACS:
 18503  18504 -18505 -1092 -18506 0
 18503  18504 -18505 -1092  18507 0
 18503  18504 -18505 -1092 -18508 0

c  2+1 --> break 
c    (-b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 18503 -18504  18505 -1092 1162 0


c  2-1 --> 1
c    (-b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧ -p_1092) -> (-b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧  b^{78, 15}_0)
c  in CNF:
c     b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_2
c     b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_1
c     b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨  b^{78, 15}_0
c  in DIMACS:
 18503 -18504  18505  1092 -18506 0
 18503 -18504  18505  1092 -18507 0
 18503 -18504  18505  1092  18508 0

c  1-1 --> 0
c    (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0 ∧ -p_1092) -> (-b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧ -b^{78, 15}_0)
c  in CNF:
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_2
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_1
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_0
c  in DIMACS:
 18503  18504 -18505  1092 -18506 0
 18503  18504 -18505  1092 -18507 0
 18503  18504 -18505  1092 -18508 0

c  0-1 --> -1
c    (-b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧ -p_1092) -> ( b^{78, 15}_2 ∧ -b^{78, 15}_1 ∧  b^{78, 15}_0)
c  in CNF:
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨  b^{78, 15}_2
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_1
c     b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨  b^{78, 15}_0
c  in DIMACS:
 18503  18504  18505  1092  18506 0
 18503  18504  18505  1092 -18507 0
 18503  18504  18505  1092  18508 0

c  -1-1 --> -2
c    ( b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧  b^{78, 14}_0 ∧ -p_1092) -> ( b^{78, 15}_2 ∧  b^{78, 15}_1 ∧ -b^{78, 15}_0)
c  in CNF:
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨  b^{78, 15}_2
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨  b^{78, 15}_1
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨  p_1092 ∨ -b^{78, 15}_0
c  in DIMACS:
-18503  18504 -18505  1092  18506 0
-18503  18504 -18505  1092  18507 0
-18503  18504 -18505  1092 -18508 0

c  -2-1 --> break 
c    ( b^{78, 14}_2 ∧  b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨  b^{78, 14}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-18503 -18504  18505  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{78, 14}_2 ∧ -b^{78, 14}_1 ∧ -b^{78, 14}_0 ∧ true) 
c  in CNF:
c    -b^{78, 14}_2 ∨  b^{78, 14}_1 ∨  b^{78, 14}_0 ∨ false 
c  in DIMACS:
-18503  18504  18505  0

c  3 does not represent an automaton state.
c    -(-b^{78, 14}_2 ∧  b^{78, 14}_1 ∧  b^{78, 14}_0 ∧ true) 
c  in CNF:
c     b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ false 
c  in DIMACS:
 18503 -18504 -18505  0
c  -3 does not represent an automaton state.
c    -( b^{78, 14}_2 ∧  b^{78, 14}_1 ∧  b^{78, 14}_0 ∧ true) 
c  in CNF:
c    -b^{78, 14}_2 ∨ -b^{78, 14}_1 ∨ -b^{78, 14}_0 ∨ false 
c  in DIMACS:
-18503 -18504 -18505  0

c INIT for k = 79
c    -b^{79, 1}_2
c    -b^{79, 1}_1
c    -b^{79, 1}_0
c  in DIMACS:
-18509 0
-18510 0
-18511 0

c Transitions for k = 79
c i = 1
c  -2+1 --> -1
c    ( b^{79, 1}_2 ∧  b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧  p_79) -> ( b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0)
c  in CNF:
c    -b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨  b^{79, 2}_2
c    -b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_1
c    -b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨  b^{79, 2}_0
c  in DIMACS:
-18509 -18510  18511 -79  18512 0
-18509 -18510  18511 -79 -18513 0
-18509 -18510  18511 -79  18514 0

c  -1+1 --> 0
c    ( b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧  b^{79, 1}_0 ∧  p_79) -> (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧ -b^{79, 2}_0)
c  in CNF:
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_2
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_1
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_0
c  in DIMACS:
-18509  18510 -18511 -79 -18512 0
-18509  18510 -18511 -79 -18513 0
-18509  18510 -18511 -79 -18514 0

c  0+1 --> 1
c    (-b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧  p_79) -> (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0)
c  in CNF:
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_2
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_1
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨  b^{79, 2}_0
c  in DIMACS:
 18509  18510  18511 -79 -18512 0
 18509  18510  18511 -79 -18513 0
 18509  18510  18511 -79  18514 0

c  1+1 --> 2
c    (-b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧  b^{79, 1}_0 ∧  p_79) -> (-b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0)
c  in CNF:
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_2
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨  b^{79, 2}_1
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ -p_79 ∨ -b^{79, 2}_0
c  in DIMACS:
 18509  18510 -18511 -79 -18512 0
 18509  18510 -18511 -79  18513 0
 18509  18510 -18511 -79 -18514 0

c  2+1 --> break 
c    (-b^{79, 1}_2 ∧  b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧  p_79) -> break
c  in CNF:
c     b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ -p_79 ∨ break
c  in DIMACS:
 18509 -18510  18511 -79 1162 0


c  2-1 --> 1
c    (-b^{79, 1}_2 ∧  b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧ -p_79) -> (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0)
c  in CNF:
c     b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_2
c     b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_1
c     b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨  b^{79, 2}_0
c  in DIMACS:
 18509 -18510  18511  79 -18512 0
 18509 -18510  18511  79 -18513 0
 18509 -18510  18511  79  18514 0

c  1-1 --> 0
c    (-b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧  b^{79, 1}_0 ∧ -p_79) -> (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧ -b^{79, 2}_0)
c  in CNF:
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_2
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_1
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_0
c  in DIMACS:
 18509  18510 -18511  79 -18512 0
 18509  18510 -18511  79 -18513 0
 18509  18510 -18511  79 -18514 0

c  0-1 --> -1
c    (-b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧ -p_79) -> ( b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0)
c  in CNF:
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨  b^{79, 2}_2
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_1
c     b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨  b^{79, 2}_0
c  in DIMACS:
 18509  18510  18511  79  18512 0
 18509  18510  18511  79 -18513 0
 18509  18510  18511  79  18514 0

c  -1-1 --> -2
c    ( b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧  b^{79, 1}_0 ∧ -p_79) -> ( b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0)
c  in CNF:
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨  b^{79, 2}_2
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨  b^{79, 2}_1
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨  p_79 ∨ -b^{79, 2}_0
c  in DIMACS:
-18509  18510 -18511  79  18512 0
-18509  18510 -18511  79  18513 0
-18509  18510 -18511  79 -18514 0

c  -2-1 --> break 
c    ( b^{79, 1}_2 ∧  b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧ -p_79) -> break
c  in CNF:
c    -b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨  b^{79, 1}_0 ∨  p_79 ∨ break
c  in DIMACS:
-18509 -18510  18511  79 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 1}_2 ∧ -b^{79, 1}_1 ∧ -b^{79, 1}_0 ∧ true) 
c  in CNF:
c    -b^{79, 1}_2 ∨  b^{79, 1}_1 ∨  b^{79, 1}_0 ∨ false 
c  in DIMACS:
-18509  18510  18511  0

c  3 does not represent an automaton state.
c    -(-b^{79, 1}_2 ∧  b^{79, 1}_1 ∧  b^{79, 1}_0 ∧ true) 
c  in CNF:
c     b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ false 
c  in DIMACS:
 18509 -18510 -18511  0
c  -3 does not represent an automaton state.
c    -( b^{79, 1}_2 ∧  b^{79, 1}_1 ∧  b^{79, 1}_0 ∧ true) 
c  in CNF:
c    -b^{79, 1}_2 ∨ -b^{79, 1}_1 ∨ -b^{79, 1}_0 ∨ false 
c  in DIMACS:
-18509 -18510 -18511  0

c i = 2
c  -2+1 --> -1
c    ( b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧  p_158) -> ( b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0)
c  in CNF:
c    -b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨  b^{79, 3}_2
c    -b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_1
c    -b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨  b^{79, 3}_0
c  in DIMACS:
-18512 -18513  18514 -158  18515 0
-18512 -18513  18514 -158 -18516 0
-18512 -18513  18514 -158  18517 0

c  -1+1 --> 0
c    ( b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0 ∧  p_158) -> (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧ -b^{79, 3}_0)
c  in CNF:
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_2
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_1
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_0
c  in DIMACS:
-18512  18513 -18514 -158 -18515 0
-18512  18513 -18514 -158 -18516 0
-18512  18513 -18514 -158 -18517 0

c  0+1 --> 1
c    (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧  p_158) -> (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0)
c  in CNF:
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_2
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_1
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨  b^{79, 3}_0
c  in DIMACS:
 18512  18513  18514 -158 -18515 0
 18512  18513  18514 -158 -18516 0
 18512  18513  18514 -158  18517 0

c  1+1 --> 2
c    (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0 ∧  p_158) -> (-b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0)
c  in CNF:
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_2
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨  b^{79, 3}_1
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ -p_158 ∨ -b^{79, 3}_0
c  in DIMACS:
 18512  18513 -18514 -158 -18515 0
 18512  18513 -18514 -158  18516 0
 18512  18513 -18514 -158 -18517 0

c  2+1 --> break 
c    (-b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧  p_158) -> break
c  in CNF:
c     b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ -p_158 ∨ break
c  in DIMACS:
 18512 -18513  18514 -158 1162 0


c  2-1 --> 1
c    (-b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧ -p_158) -> (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0)
c  in CNF:
c     b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_2
c     b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_1
c     b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨  b^{79, 3}_0
c  in DIMACS:
 18512 -18513  18514  158 -18515 0
 18512 -18513  18514  158 -18516 0
 18512 -18513  18514  158  18517 0

c  1-1 --> 0
c    (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0 ∧ -p_158) -> (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧ -b^{79, 3}_0)
c  in CNF:
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_2
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_1
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_0
c  in DIMACS:
 18512  18513 -18514  158 -18515 0
 18512  18513 -18514  158 -18516 0
 18512  18513 -18514  158 -18517 0

c  0-1 --> -1
c    (-b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧ -p_158) -> ( b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0)
c  in CNF:
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨  b^{79, 3}_2
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_1
c     b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨  b^{79, 3}_0
c  in DIMACS:
 18512  18513  18514  158  18515 0
 18512  18513  18514  158 -18516 0
 18512  18513  18514  158  18517 0

c  -1-1 --> -2
c    ( b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧  b^{79, 2}_0 ∧ -p_158) -> ( b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0)
c  in CNF:
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨  b^{79, 3}_2
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨  b^{79, 3}_1
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨  p_158 ∨ -b^{79, 3}_0
c  in DIMACS:
-18512  18513 -18514  158  18515 0
-18512  18513 -18514  158  18516 0
-18512  18513 -18514  158 -18517 0

c  -2-1 --> break 
c    ( b^{79, 2}_2 ∧  b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧ -p_158) -> break
c  in CNF:
c    -b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨  b^{79, 2}_0 ∨  p_158 ∨ break
c  in DIMACS:
-18512 -18513  18514  158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 2}_2 ∧ -b^{79, 2}_1 ∧ -b^{79, 2}_0 ∧ true) 
c  in CNF:
c    -b^{79, 2}_2 ∨  b^{79, 2}_1 ∨  b^{79, 2}_0 ∨ false 
c  in DIMACS:
-18512  18513  18514  0

c  3 does not represent an automaton state.
c    -(-b^{79, 2}_2 ∧  b^{79, 2}_1 ∧  b^{79, 2}_0 ∧ true) 
c  in CNF:
c     b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ false 
c  in DIMACS:
 18512 -18513 -18514  0
c  -3 does not represent an automaton state.
c    -( b^{79, 2}_2 ∧  b^{79, 2}_1 ∧  b^{79, 2}_0 ∧ true) 
c  in CNF:
c    -b^{79, 2}_2 ∨ -b^{79, 2}_1 ∨ -b^{79, 2}_0 ∨ false 
c  in DIMACS:
-18512 -18513 -18514  0

c i = 3
c  -2+1 --> -1
c    ( b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧  p_237) -> ( b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0)
c  in CNF:
c    -b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨  b^{79, 4}_2
c    -b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_1
c    -b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨  b^{79, 4}_0
c  in DIMACS:
-18515 -18516  18517 -237  18518 0
-18515 -18516  18517 -237 -18519 0
-18515 -18516  18517 -237  18520 0

c  -1+1 --> 0
c    ( b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0 ∧  p_237) -> (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧ -b^{79, 4}_0)
c  in CNF:
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_2
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_1
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_0
c  in DIMACS:
-18515  18516 -18517 -237 -18518 0
-18515  18516 -18517 -237 -18519 0
-18515  18516 -18517 -237 -18520 0

c  0+1 --> 1
c    (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧  p_237) -> (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0)
c  in CNF:
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_2
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_1
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨  b^{79, 4}_0
c  in DIMACS:
 18515  18516  18517 -237 -18518 0
 18515  18516  18517 -237 -18519 0
 18515  18516  18517 -237  18520 0

c  1+1 --> 2
c    (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0 ∧  p_237) -> (-b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0)
c  in CNF:
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_2
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨  b^{79, 4}_1
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ -p_237 ∨ -b^{79, 4}_0
c  in DIMACS:
 18515  18516 -18517 -237 -18518 0
 18515  18516 -18517 -237  18519 0
 18515  18516 -18517 -237 -18520 0

c  2+1 --> break 
c    (-b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧  p_237) -> break
c  in CNF:
c     b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ -p_237 ∨ break
c  in DIMACS:
 18515 -18516  18517 -237 1162 0


c  2-1 --> 1
c    (-b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧ -p_237) -> (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0)
c  in CNF:
c     b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_2
c     b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_1
c     b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨  b^{79, 4}_0
c  in DIMACS:
 18515 -18516  18517  237 -18518 0
 18515 -18516  18517  237 -18519 0
 18515 -18516  18517  237  18520 0

c  1-1 --> 0
c    (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0 ∧ -p_237) -> (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧ -b^{79, 4}_0)
c  in CNF:
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_2
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_1
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_0
c  in DIMACS:
 18515  18516 -18517  237 -18518 0
 18515  18516 -18517  237 -18519 0
 18515  18516 -18517  237 -18520 0

c  0-1 --> -1
c    (-b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧ -p_237) -> ( b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0)
c  in CNF:
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨  b^{79, 4}_2
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_1
c     b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨  b^{79, 4}_0
c  in DIMACS:
 18515  18516  18517  237  18518 0
 18515  18516  18517  237 -18519 0
 18515  18516  18517  237  18520 0

c  -1-1 --> -2
c    ( b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧  b^{79, 3}_0 ∧ -p_237) -> ( b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0)
c  in CNF:
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨  b^{79, 4}_2
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨  b^{79, 4}_1
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨  p_237 ∨ -b^{79, 4}_0
c  in DIMACS:
-18515  18516 -18517  237  18518 0
-18515  18516 -18517  237  18519 0
-18515  18516 -18517  237 -18520 0

c  -2-1 --> break 
c    ( b^{79, 3}_2 ∧  b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧ -p_237) -> break
c  in CNF:
c    -b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨  b^{79, 3}_0 ∨  p_237 ∨ break
c  in DIMACS:
-18515 -18516  18517  237 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 3}_2 ∧ -b^{79, 3}_1 ∧ -b^{79, 3}_0 ∧ true) 
c  in CNF:
c    -b^{79, 3}_2 ∨  b^{79, 3}_1 ∨  b^{79, 3}_0 ∨ false 
c  in DIMACS:
-18515  18516  18517  0

c  3 does not represent an automaton state.
c    -(-b^{79, 3}_2 ∧  b^{79, 3}_1 ∧  b^{79, 3}_0 ∧ true) 
c  in CNF:
c     b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ false 
c  in DIMACS:
 18515 -18516 -18517  0
c  -3 does not represent an automaton state.
c    -( b^{79, 3}_2 ∧  b^{79, 3}_1 ∧  b^{79, 3}_0 ∧ true) 
c  in CNF:
c    -b^{79, 3}_2 ∨ -b^{79, 3}_1 ∨ -b^{79, 3}_0 ∨ false 
c  in DIMACS:
-18515 -18516 -18517  0

c i = 4
c  -2+1 --> -1
c    ( b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧  p_316) -> ( b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0)
c  in CNF:
c    -b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨  b^{79, 5}_2
c    -b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_1
c    -b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨  b^{79, 5}_0
c  in DIMACS:
-18518 -18519  18520 -316  18521 0
-18518 -18519  18520 -316 -18522 0
-18518 -18519  18520 -316  18523 0

c  -1+1 --> 0
c    ( b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0 ∧  p_316) -> (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧ -b^{79, 5}_0)
c  in CNF:
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_2
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_1
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_0
c  in DIMACS:
-18518  18519 -18520 -316 -18521 0
-18518  18519 -18520 -316 -18522 0
-18518  18519 -18520 -316 -18523 0

c  0+1 --> 1
c    (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧  p_316) -> (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0)
c  in CNF:
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_2
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_1
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨  b^{79, 5}_0
c  in DIMACS:
 18518  18519  18520 -316 -18521 0
 18518  18519  18520 -316 -18522 0
 18518  18519  18520 -316  18523 0

c  1+1 --> 2
c    (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0 ∧  p_316) -> (-b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0)
c  in CNF:
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_2
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨  b^{79, 5}_1
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ -p_316 ∨ -b^{79, 5}_0
c  in DIMACS:
 18518  18519 -18520 -316 -18521 0
 18518  18519 -18520 -316  18522 0
 18518  18519 -18520 -316 -18523 0

c  2+1 --> break 
c    (-b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧  p_316) -> break
c  in CNF:
c     b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 18518 -18519  18520 -316 1162 0


c  2-1 --> 1
c    (-b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧ -p_316) -> (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0)
c  in CNF:
c     b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_2
c     b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_1
c     b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨  b^{79, 5}_0
c  in DIMACS:
 18518 -18519  18520  316 -18521 0
 18518 -18519  18520  316 -18522 0
 18518 -18519  18520  316  18523 0

c  1-1 --> 0
c    (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0 ∧ -p_316) -> (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧ -b^{79, 5}_0)
c  in CNF:
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_2
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_1
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_0
c  in DIMACS:
 18518  18519 -18520  316 -18521 0
 18518  18519 -18520  316 -18522 0
 18518  18519 -18520  316 -18523 0

c  0-1 --> -1
c    (-b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧ -p_316) -> ( b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0)
c  in CNF:
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨  b^{79, 5}_2
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_1
c     b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨  b^{79, 5}_0
c  in DIMACS:
 18518  18519  18520  316  18521 0
 18518  18519  18520  316 -18522 0
 18518  18519  18520  316  18523 0

c  -1-1 --> -2
c    ( b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧  b^{79, 4}_0 ∧ -p_316) -> ( b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0)
c  in CNF:
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨  b^{79, 5}_2
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨  b^{79, 5}_1
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨  p_316 ∨ -b^{79, 5}_0
c  in DIMACS:
-18518  18519 -18520  316  18521 0
-18518  18519 -18520  316  18522 0
-18518  18519 -18520  316 -18523 0

c  -2-1 --> break 
c    ( b^{79, 4}_2 ∧  b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨  b^{79, 4}_0 ∨  p_316 ∨ break
c  in DIMACS:
-18518 -18519  18520  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 4}_2 ∧ -b^{79, 4}_1 ∧ -b^{79, 4}_0 ∧ true) 
c  in CNF:
c    -b^{79, 4}_2 ∨  b^{79, 4}_1 ∨  b^{79, 4}_0 ∨ false 
c  in DIMACS:
-18518  18519  18520  0

c  3 does not represent an automaton state.
c    -(-b^{79, 4}_2 ∧  b^{79, 4}_1 ∧  b^{79, 4}_0 ∧ true) 
c  in CNF:
c     b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ false 
c  in DIMACS:
 18518 -18519 -18520  0
c  -3 does not represent an automaton state.
c    -( b^{79, 4}_2 ∧  b^{79, 4}_1 ∧  b^{79, 4}_0 ∧ true) 
c  in CNF:
c    -b^{79, 4}_2 ∨ -b^{79, 4}_1 ∨ -b^{79, 4}_0 ∨ false 
c  in DIMACS:
-18518 -18519 -18520  0

c i = 5
c  -2+1 --> -1
c    ( b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧  p_395) -> ( b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0)
c  in CNF:
c    -b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨  b^{79, 6}_2
c    -b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_1
c    -b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨  b^{79, 6}_0
c  in DIMACS:
-18521 -18522  18523 -395  18524 0
-18521 -18522  18523 -395 -18525 0
-18521 -18522  18523 -395  18526 0

c  -1+1 --> 0
c    ( b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0 ∧  p_395) -> (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧ -b^{79, 6}_0)
c  in CNF:
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_2
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_1
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_0
c  in DIMACS:
-18521  18522 -18523 -395 -18524 0
-18521  18522 -18523 -395 -18525 0
-18521  18522 -18523 -395 -18526 0

c  0+1 --> 1
c    (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧  p_395) -> (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0)
c  in CNF:
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_2
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_1
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨  b^{79, 6}_0
c  in DIMACS:
 18521  18522  18523 -395 -18524 0
 18521  18522  18523 -395 -18525 0
 18521  18522  18523 -395  18526 0

c  1+1 --> 2
c    (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0 ∧  p_395) -> (-b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0)
c  in CNF:
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_2
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨  b^{79, 6}_1
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ -p_395 ∨ -b^{79, 6}_0
c  in DIMACS:
 18521  18522 -18523 -395 -18524 0
 18521  18522 -18523 -395  18525 0
 18521  18522 -18523 -395 -18526 0

c  2+1 --> break 
c    (-b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧  p_395) -> break
c  in CNF:
c     b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ -p_395 ∨ break
c  in DIMACS:
 18521 -18522  18523 -395 1162 0


c  2-1 --> 1
c    (-b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧ -p_395) -> (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0)
c  in CNF:
c     b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_2
c     b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_1
c     b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨  b^{79, 6}_0
c  in DIMACS:
 18521 -18522  18523  395 -18524 0
 18521 -18522  18523  395 -18525 0
 18521 -18522  18523  395  18526 0

c  1-1 --> 0
c    (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0 ∧ -p_395) -> (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧ -b^{79, 6}_0)
c  in CNF:
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_2
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_1
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_0
c  in DIMACS:
 18521  18522 -18523  395 -18524 0
 18521  18522 -18523  395 -18525 0
 18521  18522 -18523  395 -18526 0

c  0-1 --> -1
c    (-b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧ -p_395) -> ( b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0)
c  in CNF:
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨  b^{79, 6}_2
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_1
c     b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨  b^{79, 6}_0
c  in DIMACS:
 18521  18522  18523  395  18524 0
 18521  18522  18523  395 -18525 0
 18521  18522  18523  395  18526 0

c  -1-1 --> -2
c    ( b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧  b^{79, 5}_0 ∧ -p_395) -> ( b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0)
c  in CNF:
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨  b^{79, 6}_2
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨  b^{79, 6}_1
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨  p_395 ∨ -b^{79, 6}_0
c  in DIMACS:
-18521  18522 -18523  395  18524 0
-18521  18522 -18523  395  18525 0
-18521  18522 -18523  395 -18526 0

c  -2-1 --> break 
c    ( b^{79, 5}_2 ∧  b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧ -p_395) -> break
c  in CNF:
c    -b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨  b^{79, 5}_0 ∨  p_395 ∨ break
c  in DIMACS:
-18521 -18522  18523  395 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 5}_2 ∧ -b^{79, 5}_1 ∧ -b^{79, 5}_0 ∧ true) 
c  in CNF:
c    -b^{79, 5}_2 ∨  b^{79, 5}_1 ∨  b^{79, 5}_0 ∨ false 
c  in DIMACS:
-18521  18522  18523  0

c  3 does not represent an automaton state.
c    -(-b^{79, 5}_2 ∧  b^{79, 5}_1 ∧  b^{79, 5}_0 ∧ true) 
c  in CNF:
c     b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ false 
c  in DIMACS:
 18521 -18522 -18523  0
c  -3 does not represent an automaton state.
c    -( b^{79, 5}_2 ∧  b^{79, 5}_1 ∧  b^{79, 5}_0 ∧ true) 
c  in CNF:
c    -b^{79, 5}_2 ∨ -b^{79, 5}_1 ∨ -b^{79, 5}_0 ∨ false 
c  in DIMACS:
-18521 -18522 -18523  0

c i = 6
c  -2+1 --> -1
c    ( b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧  p_474) -> ( b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0)
c  in CNF:
c    -b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨  b^{79, 7}_2
c    -b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_1
c    -b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨  b^{79, 7}_0
c  in DIMACS:
-18524 -18525  18526 -474  18527 0
-18524 -18525  18526 -474 -18528 0
-18524 -18525  18526 -474  18529 0

c  -1+1 --> 0
c    ( b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0 ∧  p_474) -> (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧ -b^{79, 7}_0)
c  in CNF:
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_2
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_1
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_0
c  in DIMACS:
-18524  18525 -18526 -474 -18527 0
-18524  18525 -18526 -474 -18528 0
-18524  18525 -18526 -474 -18529 0

c  0+1 --> 1
c    (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧  p_474) -> (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0)
c  in CNF:
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_2
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_1
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨  b^{79, 7}_0
c  in DIMACS:
 18524  18525  18526 -474 -18527 0
 18524  18525  18526 -474 -18528 0
 18524  18525  18526 -474  18529 0

c  1+1 --> 2
c    (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0 ∧  p_474) -> (-b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0)
c  in CNF:
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_2
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨  b^{79, 7}_1
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ -p_474 ∨ -b^{79, 7}_0
c  in DIMACS:
 18524  18525 -18526 -474 -18527 0
 18524  18525 -18526 -474  18528 0
 18524  18525 -18526 -474 -18529 0

c  2+1 --> break 
c    (-b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧  p_474) -> break
c  in CNF:
c     b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 18524 -18525  18526 -474 1162 0


c  2-1 --> 1
c    (-b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧ -p_474) -> (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0)
c  in CNF:
c     b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_2
c     b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_1
c     b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨  b^{79, 7}_0
c  in DIMACS:
 18524 -18525  18526  474 -18527 0
 18524 -18525  18526  474 -18528 0
 18524 -18525  18526  474  18529 0

c  1-1 --> 0
c    (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0 ∧ -p_474) -> (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧ -b^{79, 7}_0)
c  in CNF:
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_2
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_1
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_0
c  in DIMACS:
 18524  18525 -18526  474 -18527 0
 18524  18525 -18526  474 -18528 0
 18524  18525 -18526  474 -18529 0

c  0-1 --> -1
c    (-b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧ -p_474) -> ( b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0)
c  in CNF:
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨  b^{79, 7}_2
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_1
c     b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨  b^{79, 7}_0
c  in DIMACS:
 18524  18525  18526  474  18527 0
 18524  18525  18526  474 -18528 0
 18524  18525  18526  474  18529 0

c  -1-1 --> -2
c    ( b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧  b^{79, 6}_0 ∧ -p_474) -> ( b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0)
c  in CNF:
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨  b^{79, 7}_2
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨  b^{79, 7}_1
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨  p_474 ∨ -b^{79, 7}_0
c  in DIMACS:
-18524  18525 -18526  474  18527 0
-18524  18525 -18526  474  18528 0
-18524  18525 -18526  474 -18529 0

c  -2-1 --> break 
c    ( b^{79, 6}_2 ∧  b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨  b^{79, 6}_0 ∨  p_474 ∨ break
c  in DIMACS:
-18524 -18525  18526  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 6}_2 ∧ -b^{79, 6}_1 ∧ -b^{79, 6}_0 ∧ true) 
c  in CNF:
c    -b^{79, 6}_2 ∨  b^{79, 6}_1 ∨  b^{79, 6}_0 ∨ false 
c  in DIMACS:
-18524  18525  18526  0

c  3 does not represent an automaton state.
c    -(-b^{79, 6}_2 ∧  b^{79, 6}_1 ∧  b^{79, 6}_0 ∧ true) 
c  in CNF:
c     b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ false 
c  in DIMACS:
 18524 -18525 -18526  0
c  -3 does not represent an automaton state.
c    -( b^{79, 6}_2 ∧  b^{79, 6}_1 ∧  b^{79, 6}_0 ∧ true) 
c  in CNF:
c    -b^{79, 6}_2 ∨ -b^{79, 6}_1 ∨ -b^{79, 6}_0 ∨ false 
c  in DIMACS:
-18524 -18525 -18526  0

c i = 7
c  -2+1 --> -1
c    ( b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧  p_553) -> ( b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0)
c  in CNF:
c    -b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨  b^{79, 8}_2
c    -b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_1
c    -b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨  b^{79, 8}_0
c  in DIMACS:
-18527 -18528  18529 -553  18530 0
-18527 -18528  18529 -553 -18531 0
-18527 -18528  18529 -553  18532 0

c  -1+1 --> 0
c    ( b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0 ∧  p_553) -> (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧ -b^{79, 8}_0)
c  in CNF:
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_2
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_1
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_0
c  in DIMACS:
-18527  18528 -18529 -553 -18530 0
-18527  18528 -18529 -553 -18531 0
-18527  18528 -18529 -553 -18532 0

c  0+1 --> 1
c    (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧  p_553) -> (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0)
c  in CNF:
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_2
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_1
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨  b^{79, 8}_0
c  in DIMACS:
 18527  18528  18529 -553 -18530 0
 18527  18528  18529 -553 -18531 0
 18527  18528  18529 -553  18532 0

c  1+1 --> 2
c    (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0 ∧  p_553) -> (-b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0)
c  in CNF:
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_2
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨  b^{79, 8}_1
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ -p_553 ∨ -b^{79, 8}_0
c  in DIMACS:
 18527  18528 -18529 -553 -18530 0
 18527  18528 -18529 -553  18531 0
 18527  18528 -18529 -553 -18532 0

c  2+1 --> break 
c    (-b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧  p_553) -> break
c  in CNF:
c     b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ -p_553 ∨ break
c  in DIMACS:
 18527 -18528  18529 -553 1162 0


c  2-1 --> 1
c    (-b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧ -p_553) -> (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0)
c  in CNF:
c     b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_2
c     b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_1
c     b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨  b^{79, 8}_0
c  in DIMACS:
 18527 -18528  18529  553 -18530 0
 18527 -18528  18529  553 -18531 0
 18527 -18528  18529  553  18532 0

c  1-1 --> 0
c    (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0 ∧ -p_553) -> (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧ -b^{79, 8}_0)
c  in CNF:
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_2
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_1
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_0
c  in DIMACS:
 18527  18528 -18529  553 -18530 0
 18527  18528 -18529  553 -18531 0
 18527  18528 -18529  553 -18532 0

c  0-1 --> -1
c    (-b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧ -p_553) -> ( b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0)
c  in CNF:
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨  b^{79, 8}_2
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_1
c     b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨  b^{79, 8}_0
c  in DIMACS:
 18527  18528  18529  553  18530 0
 18527  18528  18529  553 -18531 0
 18527  18528  18529  553  18532 0

c  -1-1 --> -2
c    ( b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧  b^{79, 7}_0 ∧ -p_553) -> ( b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0)
c  in CNF:
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨  b^{79, 8}_2
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨  b^{79, 8}_1
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨  p_553 ∨ -b^{79, 8}_0
c  in DIMACS:
-18527  18528 -18529  553  18530 0
-18527  18528 -18529  553  18531 0
-18527  18528 -18529  553 -18532 0

c  -2-1 --> break 
c    ( b^{79, 7}_2 ∧  b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧ -p_553) -> break
c  in CNF:
c    -b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨  b^{79, 7}_0 ∨  p_553 ∨ break
c  in DIMACS:
-18527 -18528  18529  553 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 7}_2 ∧ -b^{79, 7}_1 ∧ -b^{79, 7}_0 ∧ true) 
c  in CNF:
c    -b^{79, 7}_2 ∨  b^{79, 7}_1 ∨  b^{79, 7}_0 ∨ false 
c  in DIMACS:
-18527  18528  18529  0

c  3 does not represent an automaton state.
c    -(-b^{79, 7}_2 ∧  b^{79, 7}_1 ∧  b^{79, 7}_0 ∧ true) 
c  in CNF:
c     b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ false 
c  in DIMACS:
 18527 -18528 -18529  0
c  -3 does not represent an automaton state.
c    -( b^{79, 7}_2 ∧  b^{79, 7}_1 ∧  b^{79, 7}_0 ∧ true) 
c  in CNF:
c    -b^{79, 7}_2 ∨ -b^{79, 7}_1 ∨ -b^{79, 7}_0 ∨ false 
c  in DIMACS:
-18527 -18528 -18529  0

c i = 8
c  -2+1 --> -1
c    ( b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧  p_632) -> ( b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0)
c  in CNF:
c    -b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨  b^{79, 9}_2
c    -b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_1
c    -b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨  b^{79, 9}_0
c  in DIMACS:
-18530 -18531  18532 -632  18533 0
-18530 -18531  18532 -632 -18534 0
-18530 -18531  18532 -632  18535 0

c  -1+1 --> 0
c    ( b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0 ∧  p_632) -> (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧ -b^{79, 9}_0)
c  in CNF:
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_2
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_1
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_0
c  in DIMACS:
-18530  18531 -18532 -632 -18533 0
-18530  18531 -18532 -632 -18534 0
-18530  18531 -18532 -632 -18535 0

c  0+1 --> 1
c    (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧  p_632) -> (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0)
c  in CNF:
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_2
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_1
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨  b^{79, 9}_0
c  in DIMACS:
 18530  18531  18532 -632 -18533 0
 18530  18531  18532 -632 -18534 0
 18530  18531  18532 -632  18535 0

c  1+1 --> 2
c    (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0 ∧  p_632) -> (-b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0)
c  in CNF:
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_2
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨  b^{79, 9}_1
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ -p_632 ∨ -b^{79, 9}_0
c  in DIMACS:
 18530  18531 -18532 -632 -18533 0
 18530  18531 -18532 -632  18534 0
 18530  18531 -18532 -632 -18535 0

c  2+1 --> break 
c    (-b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧  p_632) -> break
c  in CNF:
c     b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 18530 -18531  18532 -632 1162 0


c  2-1 --> 1
c    (-b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧ -p_632) -> (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0)
c  in CNF:
c     b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_2
c     b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_1
c     b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨  b^{79, 9}_0
c  in DIMACS:
 18530 -18531  18532  632 -18533 0
 18530 -18531  18532  632 -18534 0
 18530 -18531  18532  632  18535 0

c  1-1 --> 0
c    (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0 ∧ -p_632) -> (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧ -b^{79, 9}_0)
c  in CNF:
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_2
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_1
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_0
c  in DIMACS:
 18530  18531 -18532  632 -18533 0
 18530  18531 -18532  632 -18534 0
 18530  18531 -18532  632 -18535 0

c  0-1 --> -1
c    (-b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧ -p_632) -> ( b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0)
c  in CNF:
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨  b^{79, 9}_2
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_1
c     b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨  b^{79, 9}_0
c  in DIMACS:
 18530  18531  18532  632  18533 0
 18530  18531  18532  632 -18534 0
 18530  18531  18532  632  18535 0

c  -1-1 --> -2
c    ( b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧  b^{79, 8}_0 ∧ -p_632) -> ( b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0)
c  in CNF:
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨  b^{79, 9}_2
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨  b^{79, 9}_1
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨  p_632 ∨ -b^{79, 9}_0
c  in DIMACS:
-18530  18531 -18532  632  18533 0
-18530  18531 -18532  632  18534 0
-18530  18531 -18532  632 -18535 0

c  -2-1 --> break 
c    ( b^{79, 8}_2 ∧  b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨  b^{79, 8}_0 ∨  p_632 ∨ break
c  in DIMACS:
-18530 -18531  18532  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 8}_2 ∧ -b^{79, 8}_1 ∧ -b^{79, 8}_0 ∧ true) 
c  in CNF:
c    -b^{79, 8}_2 ∨  b^{79, 8}_1 ∨  b^{79, 8}_0 ∨ false 
c  in DIMACS:
-18530  18531  18532  0

c  3 does not represent an automaton state.
c    -(-b^{79, 8}_2 ∧  b^{79, 8}_1 ∧  b^{79, 8}_0 ∧ true) 
c  in CNF:
c     b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ false 
c  in DIMACS:
 18530 -18531 -18532  0
c  -3 does not represent an automaton state.
c    -( b^{79, 8}_2 ∧  b^{79, 8}_1 ∧  b^{79, 8}_0 ∧ true) 
c  in CNF:
c    -b^{79, 8}_2 ∨ -b^{79, 8}_1 ∨ -b^{79, 8}_0 ∨ false 
c  in DIMACS:
-18530 -18531 -18532  0

c i = 9
c  -2+1 --> -1
c    ( b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧  p_711) -> ( b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0)
c  in CNF:
c    -b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨  b^{79, 10}_2
c    -b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_1
c    -b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨  b^{79, 10}_0
c  in DIMACS:
-18533 -18534  18535 -711  18536 0
-18533 -18534  18535 -711 -18537 0
-18533 -18534  18535 -711  18538 0

c  -1+1 --> 0
c    ( b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0 ∧  p_711) -> (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧ -b^{79, 10}_0)
c  in CNF:
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_2
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_1
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_0
c  in DIMACS:
-18533  18534 -18535 -711 -18536 0
-18533  18534 -18535 -711 -18537 0
-18533  18534 -18535 -711 -18538 0

c  0+1 --> 1
c    (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧  p_711) -> (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0)
c  in CNF:
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_2
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_1
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨  b^{79, 10}_0
c  in DIMACS:
 18533  18534  18535 -711 -18536 0
 18533  18534  18535 -711 -18537 0
 18533  18534  18535 -711  18538 0

c  1+1 --> 2
c    (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0 ∧  p_711) -> (-b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0)
c  in CNF:
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_2
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨  b^{79, 10}_1
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ -p_711 ∨ -b^{79, 10}_0
c  in DIMACS:
 18533  18534 -18535 -711 -18536 0
 18533  18534 -18535 -711  18537 0
 18533  18534 -18535 -711 -18538 0

c  2+1 --> break 
c    (-b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧  p_711) -> break
c  in CNF:
c     b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ -p_711 ∨ break
c  in DIMACS:
 18533 -18534  18535 -711 1162 0


c  2-1 --> 1
c    (-b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧ -p_711) -> (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0)
c  in CNF:
c     b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_2
c     b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_1
c     b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨  b^{79, 10}_0
c  in DIMACS:
 18533 -18534  18535  711 -18536 0
 18533 -18534  18535  711 -18537 0
 18533 -18534  18535  711  18538 0

c  1-1 --> 0
c    (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0 ∧ -p_711) -> (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧ -b^{79, 10}_0)
c  in CNF:
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_2
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_1
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_0
c  in DIMACS:
 18533  18534 -18535  711 -18536 0
 18533  18534 -18535  711 -18537 0
 18533  18534 -18535  711 -18538 0

c  0-1 --> -1
c    (-b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧ -p_711) -> ( b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0)
c  in CNF:
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨  b^{79, 10}_2
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_1
c     b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨  b^{79, 10}_0
c  in DIMACS:
 18533  18534  18535  711  18536 0
 18533  18534  18535  711 -18537 0
 18533  18534  18535  711  18538 0

c  -1-1 --> -2
c    ( b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧  b^{79, 9}_0 ∧ -p_711) -> ( b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0)
c  in CNF:
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨  b^{79, 10}_2
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨  b^{79, 10}_1
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨  p_711 ∨ -b^{79, 10}_0
c  in DIMACS:
-18533  18534 -18535  711  18536 0
-18533  18534 -18535  711  18537 0
-18533  18534 -18535  711 -18538 0

c  -2-1 --> break 
c    ( b^{79, 9}_2 ∧  b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧ -p_711) -> break
c  in CNF:
c    -b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨  b^{79, 9}_0 ∨  p_711 ∨ break
c  in DIMACS:
-18533 -18534  18535  711 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 9}_2 ∧ -b^{79, 9}_1 ∧ -b^{79, 9}_0 ∧ true) 
c  in CNF:
c    -b^{79, 9}_2 ∨  b^{79, 9}_1 ∨  b^{79, 9}_0 ∨ false 
c  in DIMACS:
-18533  18534  18535  0

c  3 does not represent an automaton state.
c    -(-b^{79, 9}_2 ∧  b^{79, 9}_1 ∧  b^{79, 9}_0 ∧ true) 
c  in CNF:
c     b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ false 
c  in DIMACS:
 18533 -18534 -18535  0
c  -3 does not represent an automaton state.
c    -( b^{79, 9}_2 ∧  b^{79, 9}_1 ∧  b^{79, 9}_0 ∧ true) 
c  in CNF:
c    -b^{79, 9}_2 ∨ -b^{79, 9}_1 ∨ -b^{79, 9}_0 ∨ false 
c  in DIMACS:
-18533 -18534 -18535  0

c i = 10
c  -2+1 --> -1
c    ( b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧  p_790) -> ( b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0)
c  in CNF:
c    -b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨  b^{79, 11}_2
c    -b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_1
c    -b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨  b^{79, 11}_0
c  in DIMACS:
-18536 -18537  18538 -790  18539 0
-18536 -18537  18538 -790 -18540 0
-18536 -18537  18538 -790  18541 0

c  -1+1 --> 0
c    ( b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0 ∧  p_790) -> (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧ -b^{79, 11}_0)
c  in CNF:
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_2
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_1
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_0
c  in DIMACS:
-18536  18537 -18538 -790 -18539 0
-18536  18537 -18538 -790 -18540 0
-18536  18537 -18538 -790 -18541 0

c  0+1 --> 1
c    (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧  p_790) -> (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0)
c  in CNF:
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_2
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_1
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨  b^{79, 11}_0
c  in DIMACS:
 18536  18537  18538 -790 -18539 0
 18536  18537  18538 -790 -18540 0
 18536  18537  18538 -790  18541 0

c  1+1 --> 2
c    (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0 ∧  p_790) -> (-b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0)
c  in CNF:
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_2
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨  b^{79, 11}_1
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ -p_790 ∨ -b^{79, 11}_0
c  in DIMACS:
 18536  18537 -18538 -790 -18539 0
 18536  18537 -18538 -790  18540 0
 18536  18537 -18538 -790 -18541 0

c  2+1 --> break 
c    (-b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧  p_790) -> break
c  in CNF:
c     b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 18536 -18537  18538 -790 1162 0


c  2-1 --> 1
c    (-b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧ -p_790) -> (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0)
c  in CNF:
c     b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_2
c     b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_1
c     b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨  b^{79, 11}_0
c  in DIMACS:
 18536 -18537  18538  790 -18539 0
 18536 -18537  18538  790 -18540 0
 18536 -18537  18538  790  18541 0

c  1-1 --> 0
c    (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0 ∧ -p_790) -> (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧ -b^{79, 11}_0)
c  in CNF:
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_2
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_1
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_0
c  in DIMACS:
 18536  18537 -18538  790 -18539 0
 18536  18537 -18538  790 -18540 0
 18536  18537 -18538  790 -18541 0

c  0-1 --> -1
c    (-b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧ -p_790) -> ( b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0)
c  in CNF:
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨  b^{79, 11}_2
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_1
c     b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨  b^{79, 11}_0
c  in DIMACS:
 18536  18537  18538  790  18539 0
 18536  18537  18538  790 -18540 0
 18536  18537  18538  790  18541 0

c  -1-1 --> -2
c    ( b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧  b^{79, 10}_0 ∧ -p_790) -> ( b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0)
c  in CNF:
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨  b^{79, 11}_2
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨  b^{79, 11}_1
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨  p_790 ∨ -b^{79, 11}_0
c  in DIMACS:
-18536  18537 -18538  790  18539 0
-18536  18537 -18538  790  18540 0
-18536  18537 -18538  790 -18541 0

c  -2-1 --> break 
c    ( b^{79, 10}_2 ∧  b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨  b^{79, 10}_0 ∨  p_790 ∨ break
c  in DIMACS:
-18536 -18537  18538  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 10}_2 ∧ -b^{79, 10}_1 ∧ -b^{79, 10}_0 ∧ true) 
c  in CNF:
c    -b^{79, 10}_2 ∨  b^{79, 10}_1 ∨  b^{79, 10}_0 ∨ false 
c  in DIMACS:
-18536  18537  18538  0

c  3 does not represent an automaton state.
c    -(-b^{79, 10}_2 ∧  b^{79, 10}_1 ∧  b^{79, 10}_0 ∧ true) 
c  in CNF:
c     b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ false 
c  in DIMACS:
 18536 -18537 -18538  0
c  -3 does not represent an automaton state.
c    -( b^{79, 10}_2 ∧  b^{79, 10}_1 ∧  b^{79, 10}_0 ∧ true) 
c  in CNF:
c    -b^{79, 10}_2 ∨ -b^{79, 10}_1 ∨ -b^{79, 10}_0 ∨ false 
c  in DIMACS:
-18536 -18537 -18538  0

c i = 11
c  -2+1 --> -1
c    ( b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧  p_869) -> ( b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0)
c  in CNF:
c    -b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨  b^{79, 12}_2
c    -b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_1
c    -b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨  b^{79, 12}_0
c  in DIMACS:
-18539 -18540  18541 -869  18542 0
-18539 -18540  18541 -869 -18543 0
-18539 -18540  18541 -869  18544 0

c  -1+1 --> 0
c    ( b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0 ∧  p_869) -> (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧ -b^{79, 12}_0)
c  in CNF:
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_2
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_1
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_0
c  in DIMACS:
-18539  18540 -18541 -869 -18542 0
-18539  18540 -18541 -869 -18543 0
-18539  18540 -18541 -869 -18544 0

c  0+1 --> 1
c    (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧  p_869) -> (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0)
c  in CNF:
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_2
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_1
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨  b^{79, 12}_0
c  in DIMACS:
 18539  18540  18541 -869 -18542 0
 18539  18540  18541 -869 -18543 0
 18539  18540  18541 -869  18544 0

c  1+1 --> 2
c    (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0 ∧  p_869) -> (-b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0)
c  in CNF:
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_2
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨  b^{79, 12}_1
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ -p_869 ∨ -b^{79, 12}_0
c  in DIMACS:
 18539  18540 -18541 -869 -18542 0
 18539  18540 -18541 -869  18543 0
 18539  18540 -18541 -869 -18544 0

c  2+1 --> break 
c    (-b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧  p_869) -> break
c  in CNF:
c     b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ -p_869 ∨ break
c  in DIMACS:
 18539 -18540  18541 -869 1162 0


c  2-1 --> 1
c    (-b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧ -p_869) -> (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0)
c  in CNF:
c     b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_2
c     b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_1
c     b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨  b^{79, 12}_0
c  in DIMACS:
 18539 -18540  18541  869 -18542 0
 18539 -18540  18541  869 -18543 0
 18539 -18540  18541  869  18544 0

c  1-1 --> 0
c    (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0 ∧ -p_869) -> (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧ -b^{79, 12}_0)
c  in CNF:
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_2
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_1
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_0
c  in DIMACS:
 18539  18540 -18541  869 -18542 0
 18539  18540 -18541  869 -18543 0
 18539  18540 -18541  869 -18544 0

c  0-1 --> -1
c    (-b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧ -p_869) -> ( b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0)
c  in CNF:
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨  b^{79, 12}_2
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_1
c     b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨  b^{79, 12}_0
c  in DIMACS:
 18539  18540  18541  869  18542 0
 18539  18540  18541  869 -18543 0
 18539  18540  18541  869  18544 0

c  -1-1 --> -2
c    ( b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧  b^{79, 11}_0 ∧ -p_869) -> ( b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0)
c  in CNF:
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨  b^{79, 12}_2
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨  b^{79, 12}_1
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨  p_869 ∨ -b^{79, 12}_0
c  in DIMACS:
-18539  18540 -18541  869  18542 0
-18539  18540 -18541  869  18543 0
-18539  18540 -18541  869 -18544 0

c  -2-1 --> break 
c    ( b^{79, 11}_2 ∧  b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧ -p_869) -> break
c  in CNF:
c    -b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨  b^{79, 11}_0 ∨  p_869 ∨ break
c  in DIMACS:
-18539 -18540  18541  869 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 11}_2 ∧ -b^{79, 11}_1 ∧ -b^{79, 11}_0 ∧ true) 
c  in CNF:
c    -b^{79, 11}_2 ∨  b^{79, 11}_1 ∨  b^{79, 11}_0 ∨ false 
c  in DIMACS:
-18539  18540  18541  0

c  3 does not represent an automaton state.
c    -(-b^{79, 11}_2 ∧  b^{79, 11}_1 ∧  b^{79, 11}_0 ∧ true) 
c  in CNF:
c     b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ false 
c  in DIMACS:
 18539 -18540 -18541  0
c  -3 does not represent an automaton state.
c    -( b^{79, 11}_2 ∧  b^{79, 11}_1 ∧  b^{79, 11}_0 ∧ true) 
c  in CNF:
c    -b^{79, 11}_2 ∨ -b^{79, 11}_1 ∨ -b^{79, 11}_0 ∨ false 
c  in DIMACS:
-18539 -18540 -18541  0

c i = 12
c  -2+1 --> -1
c    ( b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧  p_948) -> ( b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0)
c  in CNF:
c    -b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨  b^{79, 13}_2
c    -b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_1
c    -b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨  b^{79, 13}_0
c  in DIMACS:
-18542 -18543  18544 -948  18545 0
-18542 -18543  18544 -948 -18546 0
-18542 -18543  18544 -948  18547 0

c  -1+1 --> 0
c    ( b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0 ∧  p_948) -> (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧ -b^{79, 13}_0)
c  in CNF:
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_2
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_1
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_0
c  in DIMACS:
-18542  18543 -18544 -948 -18545 0
-18542  18543 -18544 -948 -18546 0
-18542  18543 -18544 -948 -18547 0

c  0+1 --> 1
c    (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧  p_948) -> (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0)
c  in CNF:
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_2
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_1
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨  b^{79, 13}_0
c  in DIMACS:
 18542  18543  18544 -948 -18545 0
 18542  18543  18544 -948 -18546 0
 18542  18543  18544 -948  18547 0

c  1+1 --> 2
c    (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0 ∧  p_948) -> (-b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0)
c  in CNF:
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_2
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨  b^{79, 13}_1
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ -p_948 ∨ -b^{79, 13}_0
c  in DIMACS:
 18542  18543 -18544 -948 -18545 0
 18542  18543 -18544 -948  18546 0
 18542  18543 -18544 -948 -18547 0

c  2+1 --> break 
c    (-b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧  p_948) -> break
c  in CNF:
c     b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 18542 -18543  18544 -948 1162 0


c  2-1 --> 1
c    (-b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧ -p_948) -> (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0)
c  in CNF:
c     b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_2
c     b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_1
c     b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨  b^{79, 13}_0
c  in DIMACS:
 18542 -18543  18544  948 -18545 0
 18542 -18543  18544  948 -18546 0
 18542 -18543  18544  948  18547 0

c  1-1 --> 0
c    (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0 ∧ -p_948) -> (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧ -b^{79, 13}_0)
c  in CNF:
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_2
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_1
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_0
c  in DIMACS:
 18542  18543 -18544  948 -18545 0
 18542  18543 -18544  948 -18546 0
 18542  18543 -18544  948 -18547 0

c  0-1 --> -1
c    (-b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧ -p_948) -> ( b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0)
c  in CNF:
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨  b^{79, 13}_2
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_1
c     b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨  b^{79, 13}_0
c  in DIMACS:
 18542  18543  18544  948  18545 0
 18542  18543  18544  948 -18546 0
 18542  18543  18544  948  18547 0

c  -1-1 --> -2
c    ( b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧  b^{79, 12}_0 ∧ -p_948) -> ( b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0)
c  in CNF:
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨  b^{79, 13}_2
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨  b^{79, 13}_1
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨  p_948 ∨ -b^{79, 13}_0
c  in DIMACS:
-18542  18543 -18544  948  18545 0
-18542  18543 -18544  948  18546 0
-18542  18543 -18544  948 -18547 0

c  -2-1 --> break 
c    ( b^{79, 12}_2 ∧  b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨  b^{79, 12}_0 ∨  p_948 ∨ break
c  in DIMACS:
-18542 -18543  18544  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 12}_2 ∧ -b^{79, 12}_1 ∧ -b^{79, 12}_0 ∧ true) 
c  in CNF:
c    -b^{79, 12}_2 ∨  b^{79, 12}_1 ∨  b^{79, 12}_0 ∨ false 
c  in DIMACS:
-18542  18543  18544  0

c  3 does not represent an automaton state.
c    -(-b^{79, 12}_2 ∧  b^{79, 12}_1 ∧  b^{79, 12}_0 ∧ true) 
c  in CNF:
c     b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ false 
c  in DIMACS:
 18542 -18543 -18544  0
c  -3 does not represent an automaton state.
c    -( b^{79, 12}_2 ∧  b^{79, 12}_1 ∧  b^{79, 12}_0 ∧ true) 
c  in CNF:
c    -b^{79, 12}_2 ∨ -b^{79, 12}_1 ∨ -b^{79, 12}_0 ∨ false 
c  in DIMACS:
-18542 -18543 -18544  0

c i = 13
c  -2+1 --> -1
c    ( b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧  p_1027) -> ( b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0)
c  in CNF:
c    -b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨  b^{79, 14}_2
c    -b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_1
c    -b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨  b^{79, 14}_0
c  in DIMACS:
-18545 -18546  18547 -1027  18548 0
-18545 -18546  18547 -1027 -18549 0
-18545 -18546  18547 -1027  18550 0

c  -1+1 --> 0
c    ( b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0 ∧  p_1027) -> (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧ -b^{79, 14}_0)
c  in CNF:
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_2
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_1
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_0
c  in DIMACS:
-18545  18546 -18547 -1027 -18548 0
-18545  18546 -18547 -1027 -18549 0
-18545  18546 -18547 -1027 -18550 0

c  0+1 --> 1
c    (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧  p_1027) -> (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0)
c  in CNF:
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_2
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_1
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨  b^{79, 14}_0
c  in DIMACS:
 18545  18546  18547 -1027 -18548 0
 18545  18546  18547 -1027 -18549 0
 18545  18546  18547 -1027  18550 0

c  1+1 --> 2
c    (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0 ∧  p_1027) -> (-b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0)
c  in CNF:
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_2
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨  b^{79, 14}_1
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ -p_1027 ∨ -b^{79, 14}_0
c  in DIMACS:
 18545  18546 -18547 -1027 -18548 0
 18545  18546 -18547 -1027  18549 0
 18545  18546 -18547 -1027 -18550 0

c  2+1 --> break 
c    (-b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧  p_1027) -> break
c  in CNF:
c     b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ -p_1027 ∨ break
c  in DIMACS:
 18545 -18546  18547 -1027 1162 0


c  2-1 --> 1
c    (-b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧ -p_1027) -> (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0)
c  in CNF:
c     b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_2
c     b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_1
c     b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨  b^{79, 14}_0
c  in DIMACS:
 18545 -18546  18547  1027 -18548 0
 18545 -18546  18547  1027 -18549 0
 18545 -18546  18547  1027  18550 0

c  1-1 --> 0
c    (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0 ∧ -p_1027) -> (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧ -b^{79, 14}_0)
c  in CNF:
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_2
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_1
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_0
c  in DIMACS:
 18545  18546 -18547  1027 -18548 0
 18545  18546 -18547  1027 -18549 0
 18545  18546 -18547  1027 -18550 0

c  0-1 --> -1
c    (-b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧ -p_1027) -> ( b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0)
c  in CNF:
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨  b^{79, 14}_2
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_1
c     b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨  b^{79, 14}_0
c  in DIMACS:
 18545  18546  18547  1027  18548 0
 18545  18546  18547  1027 -18549 0
 18545  18546  18547  1027  18550 0

c  -1-1 --> -2
c    ( b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧  b^{79, 13}_0 ∧ -p_1027) -> ( b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0)
c  in CNF:
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨  b^{79, 14}_2
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨  b^{79, 14}_1
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨  p_1027 ∨ -b^{79, 14}_0
c  in DIMACS:
-18545  18546 -18547  1027  18548 0
-18545  18546 -18547  1027  18549 0
-18545  18546 -18547  1027 -18550 0

c  -2-1 --> break 
c    ( b^{79, 13}_2 ∧  b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧ -p_1027) -> break
c  in CNF:
c    -b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨  b^{79, 13}_0 ∨  p_1027 ∨ break
c  in DIMACS:
-18545 -18546  18547  1027 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 13}_2 ∧ -b^{79, 13}_1 ∧ -b^{79, 13}_0 ∧ true) 
c  in CNF:
c    -b^{79, 13}_2 ∨  b^{79, 13}_1 ∨  b^{79, 13}_0 ∨ false 
c  in DIMACS:
-18545  18546  18547  0

c  3 does not represent an automaton state.
c    -(-b^{79, 13}_2 ∧  b^{79, 13}_1 ∧  b^{79, 13}_0 ∧ true) 
c  in CNF:
c     b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ false 
c  in DIMACS:
 18545 -18546 -18547  0
c  -3 does not represent an automaton state.
c    -( b^{79, 13}_2 ∧  b^{79, 13}_1 ∧  b^{79, 13}_0 ∧ true) 
c  in CNF:
c    -b^{79, 13}_2 ∨ -b^{79, 13}_1 ∨ -b^{79, 13}_0 ∨ false 
c  in DIMACS:
-18545 -18546 -18547  0

c i = 14
c  -2+1 --> -1
c    ( b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧  p_1106) -> ( b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧  b^{79, 15}_0)
c  in CNF:
c    -b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨  b^{79, 15}_2
c    -b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_1
c    -b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨  b^{79, 15}_0
c  in DIMACS:
-18548 -18549  18550 -1106  18551 0
-18548 -18549  18550 -1106 -18552 0
-18548 -18549  18550 -1106  18553 0

c  -1+1 --> 0
c    ( b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0 ∧  p_1106) -> (-b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧ -b^{79, 15}_0)
c  in CNF:
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_2
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_1
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_0
c  in DIMACS:
-18548  18549 -18550 -1106 -18551 0
-18548  18549 -18550 -1106 -18552 0
-18548  18549 -18550 -1106 -18553 0

c  0+1 --> 1
c    (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧  p_1106) -> (-b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧  b^{79, 15}_0)
c  in CNF:
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_2
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_1
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨  b^{79, 15}_0
c  in DIMACS:
 18548  18549  18550 -1106 -18551 0
 18548  18549  18550 -1106 -18552 0
 18548  18549  18550 -1106  18553 0

c  1+1 --> 2
c    (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0 ∧  p_1106) -> (-b^{79, 15}_2 ∧  b^{79, 15}_1 ∧ -b^{79, 15}_0)
c  in CNF:
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_2
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨  b^{79, 15}_1
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ -p_1106 ∨ -b^{79, 15}_0
c  in DIMACS:
 18548  18549 -18550 -1106 -18551 0
 18548  18549 -18550 -1106  18552 0
 18548  18549 -18550 -1106 -18553 0

c  2+1 --> break 
c    (-b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 18548 -18549  18550 -1106 1162 0


c  2-1 --> 1
c    (-b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧ -p_1106) -> (-b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧  b^{79, 15}_0)
c  in CNF:
c     b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_2
c     b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_1
c     b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨  b^{79, 15}_0
c  in DIMACS:
 18548 -18549  18550  1106 -18551 0
 18548 -18549  18550  1106 -18552 0
 18548 -18549  18550  1106  18553 0

c  1-1 --> 0
c    (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0 ∧ -p_1106) -> (-b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧ -b^{79, 15}_0)
c  in CNF:
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_2
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_1
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_0
c  in DIMACS:
 18548  18549 -18550  1106 -18551 0
 18548  18549 -18550  1106 -18552 0
 18548  18549 -18550  1106 -18553 0

c  0-1 --> -1
c    (-b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧ -p_1106) -> ( b^{79, 15}_2 ∧ -b^{79, 15}_1 ∧  b^{79, 15}_0)
c  in CNF:
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨  b^{79, 15}_2
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_1
c     b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨  b^{79, 15}_0
c  in DIMACS:
 18548  18549  18550  1106  18551 0
 18548  18549  18550  1106 -18552 0
 18548  18549  18550  1106  18553 0

c  -1-1 --> -2
c    ( b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧  b^{79, 14}_0 ∧ -p_1106) -> ( b^{79, 15}_2 ∧  b^{79, 15}_1 ∧ -b^{79, 15}_0)
c  in CNF:
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨  b^{79, 15}_2
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨  b^{79, 15}_1
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨  p_1106 ∨ -b^{79, 15}_0
c  in DIMACS:
-18548  18549 -18550  1106  18551 0
-18548  18549 -18550  1106  18552 0
-18548  18549 -18550  1106 -18553 0

c  -2-1 --> break 
c    ( b^{79, 14}_2 ∧  b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨  b^{79, 14}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-18548 -18549  18550  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{79, 14}_2 ∧ -b^{79, 14}_1 ∧ -b^{79, 14}_0 ∧ true) 
c  in CNF:
c    -b^{79, 14}_2 ∨  b^{79, 14}_1 ∨  b^{79, 14}_0 ∨ false 
c  in DIMACS:
-18548  18549  18550  0

c  3 does not represent an automaton state.
c    -(-b^{79, 14}_2 ∧  b^{79, 14}_1 ∧  b^{79, 14}_0 ∧ true) 
c  in CNF:
c     b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ false 
c  in DIMACS:
 18548 -18549 -18550  0
c  -3 does not represent an automaton state.
c    -( b^{79, 14}_2 ∧  b^{79, 14}_1 ∧  b^{79, 14}_0 ∧ true) 
c  in CNF:
c    -b^{79, 14}_2 ∨ -b^{79, 14}_1 ∨ -b^{79, 14}_0 ∨ false 
c  in DIMACS:
-18548 -18549 -18550  0

c INIT for k = 80
c    -b^{80, 1}_2
c    -b^{80, 1}_1
c    -b^{80, 1}_0
c  in DIMACS:
-18554 0
-18555 0
-18556 0

c Transitions for k = 80
c i = 1
c  -2+1 --> -1
c    ( b^{80, 1}_2 ∧  b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧  p_80) -> ( b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0)
c  in CNF:
c    -b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨  b^{80, 2}_2
c    -b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_1
c    -b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨  b^{80, 2}_0
c  in DIMACS:
-18554 -18555  18556 -80  18557 0
-18554 -18555  18556 -80 -18558 0
-18554 -18555  18556 -80  18559 0

c  -1+1 --> 0
c    ( b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧  b^{80, 1}_0 ∧  p_80) -> (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧ -b^{80, 2}_0)
c  in CNF:
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_2
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_1
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_0
c  in DIMACS:
-18554  18555 -18556 -80 -18557 0
-18554  18555 -18556 -80 -18558 0
-18554  18555 -18556 -80 -18559 0

c  0+1 --> 1
c    (-b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧  p_80) -> (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0)
c  in CNF:
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_2
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_1
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨  b^{80, 2}_0
c  in DIMACS:
 18554  18555  18556 -80 -18557 0
 18554  18555  18556 -80 -18558 0
 18554  18555  18556 -80  18559 0

c  1+1 --> 2
c    (-b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧  b^{80, 1}_0 ∧  p_80) -> (-b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0)
c  in CNF:
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_2
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨  b^{80, 2}_1
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ -p_80 ∨ -b^{80, 2}_0
c  in DIMACS:
 18554  18555 -18556 -80 -18557 0
 18554  18555 -18556 -80  18558 0
 18554  18555 -18556 -80 -18559 0

c  2+1 --> break 
c    (-b^{80, 1}_2 ∧  b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧  p_80) -> break
c  in CNF:
c     b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ -p_80 ∨ break
c  in DIMACS:
 18554 -18555  18556 -80 1162 0


c  2-1 --> 1
c    (-b^{80, 1}_2 ∧  b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧ -p_80) -> (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0)
c  in CNF:
c     b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_2
c     b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_1
c     b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨  b^{80, 2}_0
c  in DIMACS:
 18554 -18555  18556  80 -18557 0
 18554 -18555  18556  80 -18558 0
 18554 -18555  18556  80  18559 0

c  1-1 --> 0
c    (-b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧  b^{80, 1}_0 ∧ -p_80) -> (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧ -b^{80, 2}_0)
c  in CNF:
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_2
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_1
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_0
c  in DIMACS:
 18554  18555 -18556  80 -18557 0
 18554  18555 -18556  80 -18558 0
 18554  18555 -18556  80 -18559 0

c  0-1 --> -1
c    (-b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧ -p_80) -> ( b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0)
c  in CNF:
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨  b^{80, 2}_2
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_1
c     b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨  b^{80, 2}_0
c  in DIMACS:
 18554  18555  18556  80  18557 0
 18554  18555  18556  80 -18558 0
 18554  18555  18556  80  18559 0

c  -1-1 --> -2
c    ( b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧  b^{80, 1}_0 ∧ -p_80) -> ( b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0)
c  in CNF:
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨  b^{80, 2}_2
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨  b^{80, 2}_1
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨  p_80 ∨ -b^{80, 2}_0
c  in DIMACS:
-18554  18555 -18556  80  18557 0
-18554  18555 -18556  80  18558 0
-18554  18555 -18556  80 -18559 0

c  -2-1 --> break 
c    ( b^{80, 1}_2 ∧  b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧ -p_80) -> break
c  in CNF:
c    -b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨  b^{80, 1}_0 ∨  p_80 ∨ break
c  in DIMACS:
-18554 -18555  18556  80 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 1}_2 ∧ -b^{80, 1}_1 ∧ -b^{80, 1}_0 ∧ true) 
c  in CNF:
c    -b^{80, 1}_2 ∨  b^{80, 1}_1 ∨  b^{80, 1}_0 ∨ false 
c  in DIMACS:
-18554  18555  18556  0

c  3 does not represent an automaton state.
c    -(-b^{80, 1}_2 ∧  b^{80, 1}_1 ∧  b^{80, 1}_0 ∧ true) 
c  in CNF:
c     b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ false 
c  in DIMACS:
 18554 -18555 -18556  0
c  -3 does not represent an automaton state.
c    -( b^{80, 1}_2 ∧  b^{80, 1}_1 ∧  b^{80, 1}_0 ∧ true) 
c  in CNF:
c    -b^{80, 1}_2 ∨ -b^{80, 1}_1 ∨ -b^{80, 1}_0 ∨ false 
c  in DIMACS:
-18554 -18555 -18556  0

c i = 2
c  -2+1 --> -1
c    ( b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧  p_160) -> ( b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0)
c  in CNF:
c    -b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨  b^{80, 3}_2
c    -b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_1
c    -b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨  b^{80, 3}_0
c  in DIMACS:
-18557 -18558  18559 -160  18560 0
-18557 -18558  18559 -160 -18561 0
-18557 -18558  18559 -160  18562 0

c  -1+1 --> 0
c    ( b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0 ∧  p_160) -> (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧ -b^{80, 3}_0)
c  in CNF:
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_2
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_1
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_0
c  in DIMACS:
-18557  18558 -18559 -160 -18560 0
-18557  18558 -18559 -160 -18561 0
-18557  18558 -18559 -160 -18562 0

c  0+1 --> 1
c    (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧  p_160) -> (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0)
c  in CNF:
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_2
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_1
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨  b^{80, 3}_0
c  in DIMACS:
 18557  18558  18559 -160 -18560 0
 18557  18558  18559 -160 -18561 0
 18557  18558  18559 -160  18562 0

c  1+1 --> 2
c    (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0 ∧  p_160) -> (-b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0)
c  in CNF:
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_2
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨  b^{80, 3}_1
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ -p_160 ∨ -b^{80, 3}_0
c  in DIMACS:
 18557  18558 -18559 -160 -18560 0
 18557  18558 -18559 -160  18561 0
 18557  18558 -18559 -160 -18562 0

c  2+1 --> break 
c    (-b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧  p_160) -> break
c  in CNF:
c     b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 18557 -18558  18559 -160 1162 0


c  2-1 --> 1
c    (-b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧ -p_160) -> (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0)
c  in CNF:
c     b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_2
c     b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_1
c     b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨  b^{80, 3}_0
c  in DIMACS:
 18557 -18558  18559  160 -18560 0
 18557 -18558  18559  160 -18561 0
 18557 -18558  18559  160  18562 0

c  1-1 --> 0
c    (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0 ∧ -p_160) -> (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧ -b^{80, 3}_0)
c  in CNF:
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_2
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_1
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_0
c  in DIMACS:
 18557  18558 -18559  160 -18560 0
 18557  18558 -18559  160 -18561 0
 18557  18558 -18559  160 -18562 0

c  0-1 --> -1
c    (-b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧ -p_160) -> ( b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0)
c  in CNF:
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨  b^{80, 3}_2
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_1
c     b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨  b^{80, 3}_0
c  in DIMACS:
 18557  18558  18559  160  18560 0
 18557  18558  18559  160 -18561 0
 18557  18558  18559  160  18562 0

c  -1-1 --> -2
c    ( b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧  b^{80, 2}_0 ∧ -p_160) -> ( b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0)
c  in CNF:
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨  b^{80, 3}_2
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨  b^{80, 3}_1
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨  p_160 ∨ -b^{80, 3}_0
c  in DIMACS:
-18557  18558 -18559  160  18560 0
-18557  18558 -18559  160  18561 0
-18557  18558 -18559  160 -18562 0

c  -2-1 --> break 
c    ( b^{80, 2}_2 ∧  b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨  b^{80, 2}_0 ∨  p_160 ∨ break
c  in DIMACS:
-18557 -18558  18559  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 2}_2 ∧ -b^{80, 2}_1 ∧ -b^{80, 2}_0 ∧ true) 
c  in CNF:
c    -b^{80, 2}_2 ∨  b^{80, 2}_1 ∨  b^{80, 2}_0 ∨ false 
c  in DIMACS:
-18557  18558  18559  0

c  3 does not represent an automaton state.
c    -(-b^{80, 2}_2 ∧  b^{80, 2}_1 ∧  b^{80, 2}_0 ∧ true) 
c  in CNF:
c     b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ false 
c  in DIMACS:
 18557 -18558 -18559  0
c  -3 does not represent an automaton state.
c    -( b^{80, 2}_2 ∧  b^{80, 2}_1 ∧  b^{80, 2}_0 ∧ true) 
c  in CNF:
c    -b^{80, 2}_2 ∨ -b^{80, 2}_1 ∨ -b^{80, 2}_0 ∨ false 
c  in DIMACS:
-18557 -18558 -18559  0

c i = 3
c  -2+1 --> -1
c    ( b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧  p_240) -> ( b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0)
c  in CNF:
c    -b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨  b^{80, 4}_2
c    -b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_1
c    -b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨  b^{80, 4}_0
c  in DIMACS:
-18560 -18561  18562 -240  18563 0
-18560 -18561  18562 -240 -18564 0
-18560 -18561  18562 -240  18565 0

c  -1+1 --> 0
c    ( b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0 ∧  p_240) -> (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧ -b^{80, 4}_0)
c  in CNF:
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_2
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_1
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_0
c  in DIMACS:
-18560  18561 -18562 -240 -18563 0
-18560  18561 -18562 -240 -18564 0
-18560  18561 -18562 -240 -18565 0

c  0+1 --> 1
c    (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧  p_240) -> (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0)
c  in CNF:
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_2
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_1
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨  b^{80, 4}_0
c  in DIMACS:
 18560  18561  18562 -240 -18563 0
 18560  18561  18562 -240 -18564 0
 18560  18561  18562 -240  18565 0

c  1+1 --> 2
c    (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0 ∧  p_240) -> (-b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0)
c  in CNF:
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_2
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨  b^{80, 4}_1
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ -p_240 ∨ -b^{80, 4}_0
c  in DIMACS:
 18560  18561 -18562 -240 -18563 0
 18560  18561 -18562 -240  18564 0
 18560  18561 -18562 -240 -18565 0

c  2+1 --> break 
c    (-b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧  p_240) -> break
c  in CNF:
c     b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 18560 -18561  18562 -240 1162 0


c  2-1 --> 1
c    (-b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧ -p_240) -> (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0)
c  in CNF:
c     b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_2
c     b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_1
c     b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨  b^{80, 4}_0
c  in DIMACS:
 18560 -18561  18562  240 -18563 0
 18560 -18561  18562  240 -18564 0
 18560 -18561  18562  240  18565 0

c  1-1 --> 0
c    (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0 ∧ -p_240) -> (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧ -b^{80, 4}_0)
c  in CNF:
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_2
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_1
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_0
c  in DIMACS:
 18560  18561 -18562  240 -18563 0
 18560  18561 -18562  240 -18564 0
 18560  18561 -18562  240 -18565 0

c  0-1 --> -1
c    (-b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧ -p_240) -> ( b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0)
c  in CNF:
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨  b^{80, 4}_2
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_1
c     b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨  b^{80, 4}_0
c  in DIMACS:
 18560  18561  18562  240  18563 0
 18560  18561  18562  240 -18564 0
 18560  18561  18562  240  18565 0

c  -1-1 --> -2
c    ( b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧  b^{80, 3}_0 ∧ -p_240) -> ( b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0)
c  in CNF:
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨  b^{80, 4}_2
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨  b^{80, 4}_1
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨  p_240 ∨ -b^{80, 4}_0
c  in DIMACS:
-18560  18561 -18562  240  18563 0
-18560  18561 -18562  240  18564 0
-18560  18561 -18562  240 -18565 0

c  -2-1 --> break 
c    ( b^{80, 3}_2 ∧  b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨  b^{80, 3}_0 ∨  p_240 ∨ break
c  in DIMACS:
-18560 -18561  18562  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 3}_2 ∧ -b^{80, 3}_1 ∧ -b^{80, 3}_0 ∧ true) 
c  in CNF:
c    -b^{80, 3}_2 ∨  b^{80, 3}_1 ∨  b^{80, 3}_0 ∨ false 
c  in DIMACS:
-18560  18561  18562  0

c  3 does not represent an automaton state.
c    -(-b^{80, 3}_2 ∧  b^{80, 3}_1 ∧  b^{80, 3}_0 ∧ true) 
c  in CNF:
c     b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ false 
c  in DIMACS:
 18560 -18561 -18562  0
c  -3 does not represent an automaton state.
c    -( b^{80, 3}_2 ∧  b^{80, 3}_1 ∧  b^{80, 3}_0 ∧ true) 
c  in CNF:
c    -b^{80, 3}_2 ∨ -b^{80, 3}_1 ∨ -b^{80, 3}_0 ∨ false 
c  in DIMACS:
-18560 -18561 -18562  0

c i = 4
c  -2+1 --> -1
c    ( b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧  p_320) -> ( b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0)
c  in CNF:
c    -b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨  b^{80, 5}_2
c    -b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_1
c    -b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨  b^{80, 5}_0
c  in DIMACS:
-18563 -18564  18565 -320  18566 0
-18563 -18564  18565 -320 -18567 0
-18563 -18564  18565 -320  18568 0

c  -1+1 --> 0
c    ( b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0 ∧  p_320) -> (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧ -b^{80, 5}_0)
c  in CNF:
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_2
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_1
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_0
c  in DIMACS:
-18563  18564 -18565 -320 -18566 0
-18563  18564 -18565 -320 -18567 0
-18563  18564 -18565 -320 -18568 0

c  0+1 --> 1
c    (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧  p_320) -> (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0)
c  in CNF:
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_2
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_1
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨  b^{80, 5}_0
c  in DIMACS:
 18563  18564  18565 -320 -18566 0
 18563  18564  18565 -320 -18567 0
 18563  18564  18565 -320  18568 0

c  1+1 --> 2
c    (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0 ∧  p_320) -> (-b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0)
c  in CNF:
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_2
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨  b^{80, 5}_1
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ -p_320 ∨ -b^{80, 5}_0
c  in DIMACS:
 18563  18564 -18565 -320 -18566 0
 18563  18564 -18565 -320  18567 0
 18563  18564 -18565 -320 -18568 0

c  2+1 --> break 
c    (-b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧  p_320) -> break
c  in CNF:
c     b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 18563 -18564  18565 -320 1162 0


c  2-1 --> 1
c    (-b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧ -p_320) -> (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0)
c  in CNF:
c     b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_2
c     b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_1
c     b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨  b^{80, 5}_0
c  in DIMACS:
 18563 -18564  18565  320 -18566 0
 18563 -18564  18565  320 -18567 0
 18563 -18564  18565  320  18568 0

c  1-1 --> 0
c    (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0 ∧ -p_320) -> (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧ -b^{80, 5}_0)
c  in CNF:
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_2
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_1
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_0
c  in DIMACS:
 18563  18564 -18565  320 -18566 0
 18563  18564 -18565  320 -18567 0
 18563  18564 -18565  320 -18568 0

c  0-1 --> -1
c    (-b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧ -p_320) -> ( b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0)
c  in CNF:
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨  b^{80, 5}_2
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_1
c     b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨  b^{80, 5}_0
c  in DIMACS:
 18563  18564  18565  320  18566 0
 18563  18564  18565  320 -18567 0
 18563  18564  18565  320  18568 0

c  -1-1 --> -2
c    ( b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧  b^{80, 4}_0 ∧ -p_320) -> ( b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0)
c  in CNF:
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨  b^{80, 5}_2
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨  b^{80, 5}_1
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨  p_320 ∨ -b^{80, 5}_0
c  in DIMACS:
-18563  18564 -18565  320  18566 0
-18563  18564 -18565  320  18567 0
-18563  18564 -18565  320 -18568 0

c  -2-1 --> break 
c    ( b^{80, 4}_2 ∧  b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨  b^{80, 4}_0 ∨  p_320 ∨ break
c  in DIMACS:
-18563 -18564  18565  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 4}_2 ∧ -b^{80, 4}_1 ∧ -b^{80, 4}_0 ∧ true) 
c  in CNF:
c    -b^{80, 4}_2 ∨  b^{80, 4}_1 ∨  b^{80, 4}_0 ∨ false 
c  in DIMACS:
-18563  18564  18565  0

c  3 does not represent an automaton state.
c    -(-b^{80, 4}_2 ∧  b^{80, 4}_1 ∧  b^{80, 4}_0 ∧ true) 
c  in CNF:
c     b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ false 
c  in DIMACS:
 18563 -18564 -18565  0
c  -3 does not represent an automaton state.
c    -( b^{80, 4}_2 ∧  b^{80, 4}_1 ∧  b^{80, 4}_0 ∧ true) 
c  in CNF:
c    -b^{80, 4}_2 ∨ -b^{80, 4}_1 ∨ -b^{80, 4}_0 ∨ false 
c  in DIMACS:
-18563 -18564 -18565  0

c i = 5
c  -2+1 --> -1
c    ( b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧  p_400) -> ( b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0)
c  in CNF:
c    -b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨  b^{80, 6}_2
c    -b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_1
c    -b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨  b^{80, 6}_0
c  in DIMACS:
-18566 -18567  18568 -400  18569 0
-18566 -18567  18568 -400 -18570 0
-18566 -18567  18568 -400  18571 0

c  -1+1 --> 0
c    ( b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0 ∧  p_400) -> (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧ -b^{80, 6}_0)
c  in CNF:
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_2
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_1
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_0
c  in DIMACS:
-18566  18567 -18568 -400 -18569 0
-18566  18567 -18568 -400 -18570 0
-18566  18567 -18568 -400 -18571 0

c  0+1 --> 1
c    (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧  p_400) -> (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0)
c  in CNF:
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_2
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_1
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨  b^{80, 6}_0
c  in DIMACS:
 18566  18567  18568 -400 -18569 0
 18566  18567  18568 -400 -18570 0
 18566  18567  18568 -400  18571 0

c  1+1 --> 2
c    (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0 ∧  p_400) -> (-b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0)
c  in CNF:
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_2
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨  b^{80, 6}_1
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ -p_400 ∨ -b^{80, 6}_0
c  in DIMACS:
 18566  18567 -18568 -400 -18569 0
 18566  18567 -18568 -400  18570 0
 18566  18567 -18568 -400 -18571 0

c  2+1 --> break 
c    (-b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧  p_400) -> break
c  in CNF:
c     b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 18566 -18567  18568 -400 1162 0


c  2-1 --> 1
c    (-b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧ -p_400) -> (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0)
c  in CNF:
c     b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_2
c     b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_1
c     b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨  b^{80, 6}_0
c  in DIMACS:
 18566 -18567  18568  400 -18569 0
 18566 -18567  18568  400 -18570 0
 18566 -18567  18568  400  18571 0

c  1-1 --> 0
c    (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0 ∧ -p_400) -> (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧ -b^{80, 6}_0)
c  in CNF:
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_2
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_1
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_0
c  in DIMACS:
 18566  18567 -18568  400 -18569 0
 18566  18567 -18568  400 -18570 0
 18566  18567 -18568  400 -18571 0

c  0-1 --> -1
c    (-b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧ -p_400) -> ( b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0)
c  in CNF:
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨  b^{80, 6}_2
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_1
c     b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨  b^{80, 6}_0
c  in DIMACS:
 18566  18567  18568  400  18569 0
 18566  18567  18568  400 -18570 0
 18566  18567  18568  400  18571 0

c  -1-1 --> -2
c    ( b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧  b^{80, 5}_0 ∧ -p_400) -> ( b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0)
c  in CNF:
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨  b^{80, 6}_2
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨  b^{80, 6}_1
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨  p_400 ∨ -b^{80, 6}_0
c  in DIMACS:
-18566  18567 -18568  400  18569 0
-18566  18567 -18568  400  18570 0
-18566  18567 -18568  400 -18571 0

c  -2-1 --> break 
c    ( b^{80, 5}_2 ∧  b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨  b^{80, 5}_0 ∨  p_400 ∨ break
c  in DIMACS:
-18566 -18567  18568  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 5}_2 ∧ -b^{80, 5}_1 ∧ -b^{80, 5}_0 ∧ true) 
c  in CNF:
c    -b^{80, 5}_2 ∨  b^{80, 5}_1 ∨  b^{80, 5}_0 ∨ false 
c  in DIMACS:
-18566  18567  18568  0

c  3 does not represent an automaton state.
c    -(-b^{80, 5}_2 ∧  b^{80, 5}_1 ∧  b^{80, 5}_0 ∧ true) 
c  in CNF:
c     b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ false 
c  in DIMACS:
 18566 -18567 -18568  0
c  -3 does not represent an automaton state.
c    -( b^{80, 5}_2 ∧  b^{80, 5}_1 ∧  b^{80, 5}_0 ∧ true) 
c  in CNF:
c    -b^{80, 5}_2 ∨ -b^{80, 5}_1 ∨ -b^{80, 5}_0 ∨ false 
c  in DIMACS:
-18566 -18567 -18568  0

c i = 6
c  -2+1 --> -1
c    ( b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧  p_480) -> ( b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0)
c  in CNF:
c    -b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨  b^{80, 7}_2
c    -b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_1
c    -b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨  b^{80, 7}_0
c  in DIMACS:
-18569 -18570  18571 -480  18572 0
-18569 -18570  18571 -480 -18573 0
-18569 -18570  18571 -480  18574 0

c  -1+1 --> 0
c    ( b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0 ∧  p_480) -> (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧ -b^{80, 7}_0)
c  in CNF:
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_2
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_1
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_0
c  in DIMACS:
-18569  18570 -18571 -480 -18572 0
-18569  18570 -18571 -480 -18573 0
-18569  18570 -18571 -480 -18574 0

c  0+1 --> 1
c    (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧  p_480) -> (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0)
c  in CNF:
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_2
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_1
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨  b^{80, 7}_0
c  in DIMACS:
 18569  18570  18571 -480 -18572 0
 18569  18570  18571 -480 -18573 0
 18569  18570  18571 -480  18574 0

c  1+1 --> 2
c    (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0 ∧  p_480) -> (-b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0)
c  in CNF:
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_2
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨  b^{80, 7}_1
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ -p_480 ∨ -b^{80, 7}_0
c  in DIMACS:
 18569  18570 -18571 -480 -18572 0
 18569  18570 -18571 -480  18573 0
 18569  18570 -18571 -480 -18574 0

c  2+1 --> break 
c    (-b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧  p_480) -> break
c  in CNF:
c     b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 18569 -18570  18571 -480 1162 0


c  2-1 --> 1
c    (-b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧ -p_480) -> (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0)
c  in CNF:
c     b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_2
c     b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_1
c     b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨  b^{80, 7}_0
c  in DIMACS:
 18569 -18570  18571  480 -18572 0
 18569 -18570  18571  480 -18573 0
 18569 -18570  18571  480  18574 0

c  1-1 --> 0
c    (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0 ∧ -p_480) -> (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧ -b^{80, 7}_0)
c  in CNF:
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_2
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_1
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_0
c  in DIMACS:
 18569  18570 -18571  480 -18572 0
 18569  18570 -18571  480 -18573 0
 18569  18570 -18571  480 -18574 0

c  0-1 --> -1
c    (-b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧ -p_480) -> ( b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0)
c  in CNF:
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨  b^{80, 7}_2
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_1
c     b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨  b^{80, 7}_0
c  in DIMACS:
 18569  18570  18571  480  18572 0
 18569  18570  18571  480 -18573 0
 18569  18570  18571  480  18574 0

c  -1-1 --> -2
c    ( b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧  b^{80, 6}_0 ∧ -p_480) -> ( b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0)
c  in CNF:
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨  b^{80, 7}_2
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨  b^{80, 7}_1
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨  p_480 ∨ -b^{80, 7}_0
c  in DIMACS:
-18569  18570 -18571  480  18572 0
-18569  18570 -18571  480  18573 0
-18569  18570 -18571  480 -18574 0

c  -2-1 --> break 
c    ( b^{80, 6}_2 ∧  b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨  b^{80, 6}_0 ∨  p_480 ∨ break
c  in DIMACS:
-18569 -18570  18571  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 6}_2 ∧ -b^{80, 6}_1 ∧ -b^{80, 6}_0 ∧ true) 
c  in CNF:
c    -b^{80, 6}_2 ∨  b^{80, 6}_1 ∨  b^{80, 6}_0 ∨ false 
c  in DIMACS:
-18569  18570  18571  0

c  3 does not represent an automaton state.
c    -(-b^{80, 6}_2 ∧  b^{80, 6}_1 ∧  b^{80, 6}_0 ∧ true) 
c  in CNF:
c     b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ false 
c  in DIMACS:
 18569 -18570 -18571  0
c  -3 does not represent an automaton state.
c    -( b^{80, 6}_2 ∧  b^{80, 6}_1 ∧  b^{80, 6}_0 ∧ true) 
c  in CNF:
c    -b^{80, 6}_2 ∨ -b^{80, 6}_1 ∨ -b^{80, 6}_0 ∨ false 
c  in DIMACS:
-18569 -18570 -18571  0

c i = 7
c  -2+1 --> -1
c    ( b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧  p_560) -> ( b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0)
c  in CNF:
c    -b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨  b^{80, 8}_2
c    -b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_1
c    -b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨  b^{80, 8}_0
c  in DIMACS:
-18572 -18573  18574 -560  18575 0
-18572 -18573  18574 -560 -18576 0
-18572 -18573  18574 -560  18577 0

c  -1+1 --> 0
c    ( b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0 ∧  p_560) -> (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧ -b^{80, 8}_0)
c  in CNF:
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_2
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_1
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_0
c  in DIMACS:
-18572  18573 -18574 -560 -18575 0
-18572  18573 -18574 -560 -18576 0
-18572  18573 -18574 -560 -18577 0

c  0+1 --> 1
c    (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧  p_560) -> (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0)
c  in CNF:
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_2
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_1
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨  b^{80, 8}_0
c  in DIMACS:
 18572  18573  18574 -560 -18575 0
 18572  18573  18574 -560 -18576 0
 18572  18573  18574 -560  18577 0

c  1+1 --> 2
c    (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0 ∧  p_560) -> (-b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0)
c  in CNF:
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_2
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨  b^{80, 8}_1
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ -p_560 ∨ -b^{80, 8}_0
c  in DIMACS:
 18572  18573 -18574 -560 -18575 0
 18572  18573 -18574 -560  18576 0
 18572  18573 -18574 -560 -18577 0

c  2+1 --> break 
c    (-b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧  p_560) -> break
c  in CNF:
c     b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 18572 -18573  18574 -560 1162 0


c  2-1 --> 1
c    (-b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧ -p_560) -> (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0)
c  in CNF:
c     b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_2
c     b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_1
c     b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨  b^{80, 8}_0
c  in DIMACS:
 18572 -18573  18574  560 -18575 0
 18572 -18573  18574  560 -18576 0
 18572 -18573  18574  560  18577 0

c  1-1 --> 0
c    (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0 ∧ -p_560) -> (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧ -b^{80, 8}_0)
c  in CNF:
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_2
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_1
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_0
c  in DIMACS:
 18572  18573 -18574  560 -18575 0
 18572  18573 -18574  560 -18576 0
 18572  18573 -18574  560 -18577 0

c  0-1 --> -1
c    (-b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧ -p_560) -> ( b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0)
c  in CNF:
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨  b^{80, 8}_2
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_1
c     b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨  b^{80, 8}_0
c  in DIMACS:
 18572  18573  18574  560  18575 0
 18572  18573  18574  560 -18576 0
 18572  18573  18574  560  18577 0

c  -1-1 --> -2
c    ( b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧  b^{80, 7}_0 ∧ -p_560) -> ( b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0)
c  in CNF:
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨  b^{80, 8}_2
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨  b^{80, 8}_1
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨  p_560 ∨ -b^{80, 8}_0
c  in DIMACS:
-18572  18573 -18574  560  18575 0
-18572  18573 -18574  560  18576 0
-18572  18573 -18574  560 -18577 0

c  -2-1 --> break 
c    ( b^{80, 7}_2 ∧  b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨  b^{80, 7}_0 ∨  p_560 ∨ break
c  in DIMACS:
-18572 -18573  18574  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 7}_2 ∧ -b^{80, 7}_1 ∧ -b^{80, 7}_0 ∧ true) 
c  in CNF:
c    -b^{80, 7}_2 ∨  b^{80, 7}_1 ∨  b^{80, 7}_0 ∨ false 
c  in DIMACS:
-18572  18573  18574  0

c  3 does not represent an automaton state.
c    -(-b^{80, 7}_2 ∧  b^{80, 7}_1 ∧  b^{80, 7}_0 ∧ true) 
c  in CNF:
c     b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ false 
c  in DIMACS:
 18572 -18573 -18574  0
c  -3 does not represent an automaton state.
c    -( b^{80, 7}_2 ∧  b^{80, 7}_1 ∧  b^{80, 7}_0 ∧ true) 
c  in CNF:
c    -b^{80, 7}_2 ∨ -b^{80, 7}_1 ∨ -b^{80, 7}_0 ∨ false 
c  in DIMACS:
-18572 -18573 -18574  0

c i = 8
c  -2+1 --> -1
c    ( b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧  p_640) -> ( b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0)
c  in CNF:
c    -b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨  b^{80, 9}_2
c    -b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_1
c    -b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨  b^{80, 9}_0
c  in DIMACS:
-18575 -18576  18577 -640  18578 0
-18575 -18576  18577 -640 -18579 0
-18575 -18576  18577 -640  18580 0

c  -1+1 --> 0
c    ( b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0 ∧  p_640) -> (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧ -b^{80, 9}_0)
c  in CNF:
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_2
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_1
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_0
c  in DIMACS:
-18575  18576 -18577 -640 -18578 0
-18575  18576 -18577 -640 -18579 0
-18575  18576 -18577 -640 -18580 0

c  0+1 --> 1
c    (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧  p_640) -> (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0)
c  in CNF:
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_2
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_1
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨  b^{80, 9}_0
c  in DIMACS:
 18575  18576  18577 -640 -18578 0
 18575  18576  18577 -640 -18579 0
 18575  18576  18577 -640  18580 0

c  1+1 --> 2
c    (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0 ∧  p_640) -> (-b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0)
c  in CNF:
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_2
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨  b^{80, 9}_1
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ -p_640 ∨ -b^{80, 9}_0
c  in DIMACS:
 18575  18576 -18577 -640 -18578 0
 18575  18576 -18577 -640  18579 0
 18575  18576 -18577 -640 -18580 0

c  2+1 --> break 
c    (-b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧  p_640) -> break
c  in CNF:
c     b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 18575 -18576  18577 -640 1162 0


c  2-1 --> 1
c    (-b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧ -p_640) -> (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0)
c  in CNF:
c     b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_2
c     b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_1
c     b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨  b^{80, 9}_0
c  in DIMACS:
 18575 -18576  18577  640 -18578 0
 18575 -18576  18577  640 -18579 0
 18575 -18576  18577  640  18580 0

c  1-1 --> 0
c    (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0 ∧ -p_640) -> (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧ -b^{80, 9}_0)
c  in CNF:
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_2
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_1
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_0
c  in DIMACS:
 18575  18576 -18577  640 -18578 0
 18575  18576 -18577  640 -18579 0
 18575  18576 -18577  640 -18580 0

c  0-1 --> -1
c    (-b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧ -p_640) -> ( b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0)
c  in CNF:
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨  b^{80, 9}_2
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_1
c     b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨  b^{80, 9}_0
c  in DIMACS:
 18575  18576  18577  640  18578 0
 18575  18576  18577  640 -18579 0
 18575  18576  18577  640  18580 0

c  -1-1 --> -2
c    ( b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧  b^{80, 8}_0 ∧ -p_640) -> ( b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0)
c  in CNF:
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨  b^{80, 9}_2
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨  b^{80, 9}_1
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨  p_640 ∨ -b^{80, 9}_0
c  in DIMACS:
-18575  18576 -18577  640  18578 0
-18575  18576 -18577  640  18579 0
-18575  18576 -18577  640 -18580 0

c  -2-1 --> break 
c    ( b^{80, 8}_2 ∧  b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨  b^{80, 8}_0 ∨  p_640 ∨ break
c  in DIMACS:
-18575 -18576  18577  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 8}_2 ∧ -b^{80, 8}_1 ∧ -b^{80, 8}_0 ∧ true) 
c  in CNF:
c    -b^{80, 8}_2 ∨  b^{80, 8}_1 ∨  b^{80, 8}_0 ∨ false 
c  in DIMACS:
-18575  18576  18577  0

c  3 does not represent an automaton state.
c    -(-b^{80, 8}_2 ∧  b^{80, 8}_1 ∧  b^{80, 8}_0 ∧ true) 
c  in CNF:
c     b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ false 
c  in DIMACS:
 18575 -18576 -18577  0
c  -3 does not represent an automaton state.
c    -( b^{80, 8}_2 ∧  b^{80, 8}_1 ∧  b^{80, 8}_0 ∧ true) 
c  in CNF:
c    -b^{80, 8}_2 ∨ -b^{80, 8}_1 ∨ -b^{80, 8}_0 ∨ false 
c  in DIMACS:
-18575 -18576 -18577  0

c i = 9
c  -2+1 --> -1
c    ( b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧  p_720) -> ( b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0)
c  in CNF:
c    -b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨  b^{80, 10}_2
c    -b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_1
c    -b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨  b^{80, 10}_0
c  in DIMACS:
-18578 -18579  18580 -720  18581 0
-18578 -18579  18580 -720 -18582 0
-18578 -18579  18580 -720  18583 0

c  -1+1 --> 0
c    ( b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0 ∧  p_720) -> (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧ -b^{80, 10}_0)
c  in CNF:
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_2
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_1
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_0
c  in DIMACS:
-18578  18579 -18580 -720 -18581 0
-18578  18579 -18580 -720 -18582 0
-18578  18579 -18580 -720 -18583 0

c  0+1 --> 1
c    (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧  p_720) -> (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0)
c  in CNF:
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_2
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_1
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨  b^{80, 10}_0
c  in DIMACS:
 18578  18579  18580 -720 -18581 0
 18578  18579  18580 -720 -18582 0
 18578  18579  18580 -720  18583 0

c  1+1 --> 2
c    (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0 ∧  p_720) -> (-b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0)
c  in CNF:
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_2
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨  b^{80, 10}_1
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ -p_720 ∨ -b^{80, 10}_0
c  in DIMACS:
 18578  18579 -18580 -720 -18581 0
 18578  18579 -18580 -720  18582 0
 18578  18579 -18580 -720 -18583 0

c  2+1 --> break 
c    (-b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧  p_720) -> break
c  in CNF:
c     b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 18578 -18579  18580 -720 1162 0


c  2-1 --> 1
c    (-b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧ -p_720) -> (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0)
c  in CNF:
c     b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_2
c     b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_1
c     b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨  b^{80, 10}_0
c  in DIMACS:
 18578 -18579  18580  720 -18581 0
 18578 -18579  18580  720 -18582 0
 18578 -18579  18580  720  18583 0

c  1-1 --> 0
c    (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0 ∧ -p_720) -> (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧ -b^{80, 10}_0)
c  in CNF:
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_2
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_1
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_0
c  in DIMACS:
 18578  18579 -18580  720 -18581 0
 18578  18579 -18580  720 -18582 0
 18578  18579 -18580  720 -18583 0

c  0-1 --> -1
c    (-b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧ -p_720) -> ( b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0)
c  in CNF:
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨  b^{80, 10}_2
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_1
c     b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨  b^{80, 10}_0
c  in DIMACS:
 18578  18579  18580  720  18581 0
 18578  18579  18580  720 -18582 0
 18578  18579  18580  720  18583 0

c  -1-1 --> -2
c    ( b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧  b^{80, 9}_0 ∧ -p_720) -> ( b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0)
c  in CNF:
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨  b^{80, 10}_2
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨  b^{80, 10}_1
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨  p_720 ∨ -b^{80, 10}_0
c  in DIMACS:
-18578  18579 -18580  720  18581 0
-18578  18579 -18580  720  18582 0
-18578  18579 -18580  720 -18583 0

c  -2-1 --> break 
c    ( b^{80, 9}_2 ∧  b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨  b^{80, 9}_0 ∨  p_720 ∨ break
c  in DIMACS:
-18578 -18579  18580  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 9}_2 ∧ -b^{80, 9}_1 ∧ -b^{80, 9}_0 ∧ true) 
c  in CNF:
c    -b^{80, 9}_2 ∨  b^{80, 9}_1 ∨  b^{80, 9}_0 ∨ false 
c  in DIMACS:
-18578  18579  18580  0

c  3 does not represent an automaton state.
c    -(-b^{80, 9}_2 ∧  b^{80, 9}_1 ∧  b^{80, 9}_0 ∧ true) 
c  in CNF:
c     b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ false 
c  in DIMACS:
 18578 -18579 -18580  0
c  -3 does not represent an automaton state.
c    -( b^{80, 9}_2 ∧  b^{80, 9}_1 ∧  b^{80, 9}_0 ∧ true) 
c  in CNF:
c    -b^{80, 9}_2 ∨ -b^{80, 9}_1 ∨ -b^{80, 9}_0 ∨ false 
c  in DIMACS:
-18578 -18579 -18580  0

c i = 10
c  -2+1 --> -1
c    ( b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧  p_800) -> ( b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0)
c  in CNF:
c    -b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨  b^{80, 11}_2
c    -b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_1
c    -b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨  b^{80, 11}_0
c  in DIMACS:
-18581 -18582  18583 -800  18584 0
-18581 -18582  18583 -800 -18585 0
-18581 -18582  18583 -800  18586 0

c  -1+1 --> 0
c    ( b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0 ∧  p_800) -> (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧ -b^{80, 11}_0)
c  in CNF:
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_2
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_1
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_0
c  in DIMACS:
-18581  18582 -18583 -800 -18584 0
-18581  18582 -18583 -800 -18585 0
-18581  18582 -18583 -800 -18586 0

c  0+1 --> 1
c    (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧  p_800) -> (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0)
c  in CNF:
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_2
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_1
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨  b^{80, 11}_0
c  in DIMACS:
 18581  18582  18583 -800 -18584 0
 18581  18582  18583 -800 -18585 0
 18581  18582  18583 -800  18586 0

c  1+1 --> 2
c    (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0 ∧  p_800) -> (-b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0)
c  in CNF:
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_2
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨  b^{80, 11}_1
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ -p_800 ∨ -b^{80, 11}_0
c  in DIMACS:
 18581  18582 -18583 -800 -18584 0
 18581  18582 -18583 -800  18585 0
 18581  18582 -18583 -800 -18586 0

c  2+1 --> break 
c    (-b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧  p_800) -> break
c  in CNF:
c     b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 18581 -18582  18583 -800 1162 0


c  2-1 --> 1
c    (-b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧ -p_800) -> (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0)
c  in CNF:
c     b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_2
c     b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_1
c     b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨  b^{80, 11}_0
c  in DIMACS:
 18581 -18582  18583  800 -18584 0
 18581 -18582  18583  800 -18585 0
 18581 -18582  18583  800  18586 0

c  1-1 --> 0
c    (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0 ∧ -p_800) -> (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧ -b^{80, 11}_0)
c  in CNF:
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_2
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_1
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_0
c  in DIMACS:
 18581  18582 -18583  800 -18584 0
 18581  18582 -18583  800 -18585 0
 18581  18582 -18583  800 -18586 0

c  0-1 --> -1
c    (-b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧ -p_800) -> ( b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0)
c  in CNF:
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨  b^{80, 11}_2
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_1
c     b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨  b^{80, 11}_0
c  in DIMACS:
 18581  18582  18583  800  18584 0
 18581  18582  18583  800 -18585 0
 18581  18582  18583  800  18586 0

c  -1-1 --> -2
c    ( b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧  b^{80, 10}_0 ∧ -p_800) -> ( b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0)
c  in CNF:
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨  b^{80, 11}_2
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨  b^{80, 11}_1
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨  p_800 ∨ -b^{80, 11}_0
c  in DIMACS:
-18581  18582 -18583  800  18584 0
-18581  18582 -18583  800  18585 0
-18581  18582 -18583  800 -18586 0

c  -2-1 --> break 
c    ( b^{80, 10}_2 ∧  b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨  b^{80, 10}_0 ∨  p_800 ∨ break
c  in DIMACS:
-18581 -18582  18583  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 10}_2 ∧ -b^{80, 10}_1 ∧ -b^{80, 10}_0 ∧ true) 
c  in CNF:
c    -b^{80, 10}_2 ∨  b^{80, 10}_1 ∨  b^{80, 10}_0 ∨ false 
c  in DIMACS:
-18581  18582  18583  0

c  3 does not represent an automaton state.
c    -(-b^{80, 10}_2 ∧  b^{80, 10}_1 ∧  b^{80, 10}_0 ∧ true) 
c  in CNF:
c     b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ false 
c  in DIMACS:
 18581 -18582 -18583  0
c  -3 does not represent an automaton state.
c    -( b^{80, 10}_2 ∧  b^{80, 10}_1 ∧  b^{80, 10}_0 ∧ true) 
c  in CNF:
c    -b^{80, 10}_2 ∨ -b^{80, 10}_1 ∨ -b^{80, 10}_0 ∨ false 
c  in DIMACS:
-18581 -18582 -18583  0

c i = 11
c  -2+1 --> -1
c    ( b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧  p_880) -> ( b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0)
c  in CNF:
c    -b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨  b^{80, 12}_2
c    -b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_1
c    -b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨  b^{80, 12}_0
c  in DIMACS:
-18584 -18585  18586 -880  18587 0
-18584 -18585  18586 -880 -18588 0
-18584 -18585  18586 -880  18589 0

c  -1+1 --> 0
c    ( b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0 ∧  p_880) -> (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧ -b^{80, 12}_0)
c  in CNF:
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_2
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_1
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_0
c  in DIMACS:
-18584  18585 -18586 -880 -18587 0
-18584  18585 -18586 -880 -18588 0
-18584  18585 -18586 -880 -18589 0

c  0+1 --> 1
c    (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧  p_880) -> (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0)
c  in CNF:
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_2
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_1
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨  b^{80, 12}_0
c  in DIMACS:
 18584  18585  18586 -880 -18587 0
 18584  18585  18586 -880 -18588 0
 18584  18585  18586 -880  18589 0

c  1+1 --> 2
c    (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0 ∧  p_880) -> (-b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0)
c  in CNF:
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_2
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨  b^{80, 12}_1
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ -p_880 ∨ -b^{80, 12}_0
c  in DIMACS:
 18584  18585 -18586 -880 -18587 0
 18584  18585 -18586 -880  18588 0
 18584  18585 -18586 -880 -18589 0

c  2+1 --> break 
c    (-b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧  p_880) -> break
c  in CNF:
c     b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 18584 -18585  18586 -880 1162 0


c  2-1 --> 1
c    (-b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧ -p_880) -> (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0)
c  in CNF:
c     b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_2
c     b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_1
c     b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨  b^{80, 12}_0
c  in DIMACS:
 18584 -18585  18586  880 -18587 0
 18584 -18585  18586  880 -18588 0
 18584 -18585  18586  880  18589 0

c  1-1 --> 0
c    (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0 ∧ -p_880) -> (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧ -b^{80, 12}_0)
c  in CNF:
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_2
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_1
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_0
c  in DIMACS:
 18584  18585 -18586  880 -18587 0
 18584  18585 -18586  880 -18588 0
 18584  18585 -18586  880 -18589 0

c  0-1 --> -1
c    (-b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧ -p_880) -> ( b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0)
c  in CNF:
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨  b^{80, 12}_2
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_1
c     b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨  b^{80, 12}_0
c  in DIMACS:
 18584  18585  18586  880  18587 0
 18584  18585  18586  880 -18588 0
 18584  18585  18586  880  18589 0

c  -1-1 --> -2
c    ( b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧  b^{80, 11}_0 ∧ -p_880) -> ( b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0)
c  in CNF:
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨  b^{80, 12}_2
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨  b^{80, 12}_1
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨  p_880 ∨ -b^{80, 12}_0
c  in DIMACS:
-18584  18585 -18586  880  18587 0
-18584  18585 -18586  880  18588 0
-18584  18585 -18586  880 -18589 0

c  -2-1 --> break 
c    ( b^{80, 11}_2 ∧  b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨  b^{80, 11}_0 ∨  p_880 ∨ break
c  in DIMACS:
-18584 -18585  18586  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 11}_2 ∧ -b^{80, 11}_1 ∧ -b^{80, 11}_0 ∧ true) 
c  in CNF:
c    -b^{80, 11}_2 ∨  b^{80, 11}_1 ∨  b^{80, 11}_0 ∨ false 
c  in DIMACS:
-18584  18585  18586  0

c  3 does not represent an automaton state.
c    -(-b^{80, 11}_2 ∧  b^{80, 11}_1 ∧  b^{80, 11}_0 ∧ true) 
c  in CNF:
c     b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ false 
c  in DIMACS:
 18584 -18585 -18586  0
c  -3 does not represent an automaton state.
c    -( b^{80, 11}_2 ∧  b^{80, 11}_1 ∧  b^{80, 11}_0 ∧ true) 
c  in CNF:
c    -b^{80, 11}_2 ∨ -b^{80, 11}_1 ∨ -b^{80, 11}_0 ∨ false 
c  in DIMACS:
-18584 -18585 -18586  0

c i = 12
c  -2+1 --> -1
c    ( b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧  p_960) -> ( b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0)
c  in CNF:
c    -b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨  b^{80, 13}_2
c    -b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_1
c    -b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨  b^{80, 13}_0
c  in DIMACS:
-18587 -18588  18589 -960  18590 0
-18587 -18588  18589 -960 -18591 0
-18587 -18588  18589 -960  18592 0

c  -1+1 --> 0
c    ( b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0 ∧  p_960) -> (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧ -b^{80, 13}_0)
c  in CNF:
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_2
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_1
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_0
c  in DIMACS:
-18587  18588 -18589 -960 -18590 0
-18587  18588 -18589 -960 -18591 0
-18587  18588 -18589 -960 -18592 0

c  0+1 --> 1
c    (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧  p_960) -> (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0)
c  in CNF:
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_2
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_1
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨  b^{80, 13}_0
c  in DIMACS:
 18587  18588  18589 -960 -18590 0
 18587  18588  18589 -960 -18591 0
 18587  18588  18589 -960  18592 0

c  1+1 --> 2
c    (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0 ∧  p_960) -> (-b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0)
c  in CNF:
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_2
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨  b^{80, 13}_1
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ -p_960 ∨ -b^{80, 13}_0
c  in DIMACS:
 18587  18588 -18589 -960 -18590 0
 18587  18588 -18589 -960  18591 0
 18587  18588 -18589 -960 -18592 0

c  2+1 --> break 
c    (-b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧  p_960) -> break
c  in CNF:
c     b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 18587 -18588  18589 -960 1162 0


c  2-1 --> 1
c    (-b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧ -p_960) -> (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0)
c  in CNF:
c     b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_2
c     b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_1
c     b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨  b^{80, 13}_0
c  in DIMACS:
 18587 -18588  18589  960 -18590 0
 18587 -18588  18589  960 -18591 0
 18587 -18588  18589  960  18592 0

c  1-1 --> 0
c    (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0 ∧ -p_960) -> (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧ -b^{80, 13}_0)
c  in CNF:
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_2
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_1
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_0
c  in DIMACS:
 18587  18588 -18589  960 -18590 0
 18587  18588 -18589  960 -18591 0
 18587  18588 -18589  960 -18592 0

c  0-1 --> -1
c    (-b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧ -p_960) -> ( b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0)
c  in CNF:
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨  b^{80, 13}_2
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_1
c     b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨  b^{80, 13}_0
c  in DIMACS:
 18587  18588  18589  960  18590 0
 18587  18588  18589  960 -18591 0
 18587  18588  18589  960  18592 0

c  -1-1 --> -2
c    ( b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧  b^{80, 12}_0 ∧ -p_960) -> ( b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0)
c  in CNF:
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨  b^{80, 13}_2
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨  b^{80, 13}_1
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨  p_960 ∨ -b^{80, 13}_0
c  in DIMACS:
-18587  18588 -18589  960  18590 0
-18587  18588 -18589  960  18591 0
-18587  18588 -18589  960 -18592 0

c  -2-1 --> break 
c    ( b^{80, 12}_2 ∧  b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨  b^{80, 12}_0 ∨  p_960 ∨ break
c  in DIMACS:
-18587 -18588  18589  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 12}_2 ∧ -b^{80, 12}_1 ∧ -b^{80, 12}_0 ∧ true) 
c  in CNF:
c    -b^{80, 12}_2 ∨  b^{80, 12}_1 ∨  b^{80, 12}_0 ∨ false 
c  in DIMACS:
-18587  18588  18589  0

c  3 does not represent an automaton state.
c    -(-b^{80, 12}_2 ∧  b^{80, 12}_1 ∧  b^{80, 12}_0 ∧ true) 
c  in CNF:
c     b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ false 
c  in DIMACS:
 18587 -18588 -18589  0
c  -3 does not represent an automaton state.
c    -( b^{80, 12}_2 ∧  b^{80, 12}_1 ∧  b^{80, 12}_0 ∧ true) 
c  in CNF:
c    -b^{80, 12}_2 ∨ -b^{80, 12}_1 ∨ -b^{80, 12}_0 ∨ false 
c  in DIMACS:
-18587 -18588 -18589  0

c i = 13
c  -2+1 --> -1
c    ( b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧  p_1040) -> ( b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0)
c  in CNF:
c    -b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨  b^{80, 14}_2
c    -b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_1
c    -b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨  b^{80, 14}_0
c  in DIMACS:
-18590 -18591  18592 -1040  18593 0
-18590 -18591  18592 -1040 -18594 0
-18590 -18591  18592 -1040  18595 0

c  -1+1 --> 0
c    ( b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0 ∧  p_1040) -> (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧ -b^{80, 14}_0)
c  in CNF:
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_2
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_1
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_0
c  in DIMACS:
-18590  18591 -18592 -1040 -18593 0
-18590  18591 -18592 -1040 -18594 0
-18590  18591 -18592 -1040 -18595 0

c  0+1 --> 1
c    (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧  p_1040) -> (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0)
c  in CNF:
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_2
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_1
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨  b^{80, 14}_0
c  in DIMACS:
 18590  18591  18592 -1040 -18593 0
 18590  18591  18592 -1040 -18594 0
 18590  18591  18592 -1040  18595 0

c  1+1 --> 2
c    (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0 ∧  p_1040) -> (-b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0)
c  in CNF:
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_2
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨  b^{80, 14}_1
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ -p_1040 ∨ -b^{80, 14}_0
c  in DIMACS:
 18590  18591 -18592 -1040 -18593 0
 18590  18591 -18592 -1040  18594 0
 18590  18591 -18592 -1040 -18595 0

c  2+1 --> break 
c    (-b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 18590 -18591  18592 -1040 1162 0


c  2-1 --> 1
c    (-b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧ -p_1040) -> (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0)
c  in CNF:
c     b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_2
c     b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_1
c     b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨  b^{80, 14}_0
c  in DIMACS:
 18590 -18591  18592  1040 -18593 0
 18590 -18591  18592  1040 -18594 0
 18590 -18591  18592  1040  18595 0

c  1-1 --> 0
c    (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0 ∧ -p_1040) -> (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧ -b^{80, 14}_0)
c  in CNF:
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_2
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_1
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_0
c  in DIMACS:
 18590  18591 -18592  1040 -18593 0
 18590  18591 -18592  1040 -18594 0
 18590  18591 -18592  1040 -18595 0

c  0-1 --> -1
c    (-b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧ -p_1040) -> ( b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0)
c  in CNF:
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨  b^{80, 14}_2
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_1
c     b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨  b^{80, 14}_0
c  in DIMACS:
 18590  18591  18592  1040  18593 0
 18590  18591  18592  1040 -18594 0
 18590  18591  18592  1040  18595 0

c  -1-1 --> -2
c    ( b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧  b^{80, 13}_0 ∧ -p_1040) -> ( b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0)
c  in CNF:
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨  b^{80, 14}_2
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨  b^{80, 14}_1
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨  p_1040 ∨ -b^{80, 14}_0
c  in DIMACS:
-18590  18591 -18592  1040  18593 0
-18590  18591 -18592  1040  18594 0
-18590  18591 -18592  1040 -18595 0

c  -2-1 --> break 
c    ( b^{80, 13}_2 ∧  b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨  b^{80, 13}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-18590 -18591  18592  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 13}_2 ∧ -b^{80, 13}_1 ∧ -b^{80, 13}_0 ∧ true) 
c  in CNF:
c    -b^{80, 13}_2 ∨  b^{80, 13}_1 ∨  b^{80, 13}_0 ∨ false 
c  in DIMACS:
-18590  18591  18592  0

c  3 does not represent an automaton state.
c    -(-b^{80, 13}_2 ∧  b^{80, 13}_1 ∧  b^{80, 13}_0 ∧ true) 
c  in CNF:
c     b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ false 
c  in DIMACS:
 18590 -18591 -18592  0
c  -3 does not represent an automaton state.
c    -( b^{80, 13}_2 ∧  b^{80, 13}_1 ∧  b^{80, 13}_0 ∧ true) 
c  in CNF:
c    -b^{80, 13}_2 ∨ -b^{80, 13}_1 ∨ -b^{80, 13}_0 ∨ false 
c  in DIMACS:
-18590 -18591 -18592  0

c i = 14
c  -2+1 --> -1
c    ( b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧  p_1120) -> ( b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧  b^{80, 15}_0)
c  in CNF:
c    -b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨  b^{80, 15}_2
c    -b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_1
c    -b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨  b^{80, 15}_0
c  in DIMACS:
-18593 -18594  18595 -1120  18596 0
-18593 -18594  18595 -1120 -18597 0
-18593 -18594  18595 -1120  18598 0

c  -1+1 --> 0
c    ( b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0 ∧  p_1120) -> (-b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧ -b^{80, 15}_0)
c  in CNF:
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_2
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_1
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_0
c  in DIMACS:
-18593  18594 -18595 -1120 -18596 0
-18593  18594 -18595 -1120 -18597 0
-18593  18594 -18595 -1120 -18598 0

c  0+1 --> 1
c    (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧  p_1120) -> (-b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧  b^{80, 15}_0)
c  in CNF:
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_2
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_1
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨  b^{80, 15}_0
c  in DIMACS:
 18593  18594  18595 -1120 -18596 0
 18593  18594  18595 -1120 -18597 0
 18593  18594  18595 -1120  18598 0

c  1+1 --> 2
c    (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0 ∧  p_1120) -> (-b^{80, 15}_2 ∧  b^{80, 15}_1 ∧ -b^{80, 15}_0)
c  in CNF:
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_2
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨  b^{80, 15}_1
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ -p_1120 ∨ -b^{80, 15}_0
c  in DIMACS:
 18593  18594 -18595 -1120 -18596 0
 18593  18594 -18595 -1120  18597 0
 18593  18594 -18595 -1120 -18598 0

c  2+1 --> break 
c    (-b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 18593 -18594  18595 -1120 1162 0


c  2-1 --> 1
c    (-b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧ -p_1120) -> (-b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧  b^{80, 15}_0)
c  in CNF:
c     b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_2
c     b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_1
c     b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨  b^{80, 15}_0
c  in DIMACS:
 18593 -18594  18595  1120 -18596 0
 18593 -18594  18595  1120 -18597 0
 18593 -18594  18595  1120  18598 0

c  1-1 --> 0
c    (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0 ∧ -p_1120) -> (-b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧ -b^{80, 15}_0)
c  in CNF:
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_2
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_1
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_0
c  in DIMACS:
 18593  18594 -18595  1120 -18596 0
 18593  18594 -18595  1120 -18597 0
 18593  18594 -18595  1120 -18598 0

c  0-1 --> -1
c    (-b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧ -p_1120) -> ( b^{80, 15}_2 ∧ -b^{80, 15}_1 ∧  b^{80, 15}_0)
c  in CNF:
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨  b^{80, 15}_2
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_1
c     b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨  b^{80, 15}_0
c  in DIMACS:
 18593  18594  18595  1120  18596 0
 18593  18594  18595  1120 -18597 0
 18593  18594  18595  1120  18598 0

c  -1-1 --> -2
c    ( b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧  b^{80, 14}_0 ∧ -p_1120) -> ( b^{80, 15}_2 ∧  b^{80, 15}_1 ∧ -b^{80, 15}_0)
c  in CNF:
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨  b^{80, 15}_2
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨  b^{80, 15}_1
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨  p_1120 ∨ -b^{80, 15}_0
c  in DIMACS:
-18593  18594 -18595  1120  18596 0
-18593  18594 -18595  1120  18597 0
-18593  18594 -18595  1120 -18598 0

c  -2-1 --> break 
c    ( b^{80, 14}_2 ∧  b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨  b^{80, 14}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-18593 -18594  18595  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{80, 14}_2 ∧ -b^{80, 14}_1 ∧ -b^{80, 14}_0 ∧ true) 
c  in CNF:
c    -b^{80, 14}_2 ∨  b^{80, 14}_1 ∨  b^{80, 14}_0 ∨ false 
c  in DIMACS:
-18593  18594  18595  0

c  3 does not represent an automaton state.
c    -(-b^{80, 14}_2 ∧  b^{80, 14}_1 ∧  b^{80, 14}_0 ∧ true) 
c  in CNF:
c     b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ false 
c  in DIMACS:
 18593 -18594 -18595  0
c  -3 does not represent an automaton state.
c    -( b^{80, 14}_2 ∧  b^{80, 14}_1 ∧  b^{80, 14}_0 ∧ true) 
c  in CNF:
c    -b^{80, 14}_2 ∨ -b^{80, 14}_1 ∨ -b^{80, 14}_0 ∨ false 
c  in DIMACS:
-18593 -18594 -18595  0

c INIT for k = 81
c    -b^{81, 1}_2
c    -b^{81, 1}_1
c    -b^{81, 1}_0
c  in DIMACS:
-18599 0
-18600 0
-18601 0

c Transitions for k = 81
c i = 1
c  -2+1 --> -1
c    ( b^{81, 1}_2 ∧  b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧  p_81) -> ( b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0)
c  in CNF:
c    -b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨  b^{81, 2}_2
c    -b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_1
c    -b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨  b^{81, 2}_0
c  in DIMACS:
-18599 -18600  18601 -81  18602 0
-18599 -18600  18601 -81 -18603 0
-18599 -18600  18601 -81  18604 0

c  -1+1 --> 0
c    ( b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧  b^{81, 1}_0 ∧  p_81) -> (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧ -b^{81, 2}_0)
c  in CNF:
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_2
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_1
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_0
c  in DIMACS:
-18599  18600 -18601 -81 -18602 0
-18599  18600 -18601 -81 -18603 0
-18599  18600 -18601 -81 -18604 0

c  0+1 --> 1
c    (-b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧  p_81) -> (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0)
c  in CNF:
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_2
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_1
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨  b^{81, 2}_0
c  in DIMACS:
 18599  18600  18601 -81 -18602 0
 18599  18600  18601 -81 -18603 0
 18599  18600  18601 -81  18604 0

c  1+1 --> 2
c    (-b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧  b^{81, 1}_0 ∧  p_81) -> (-b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0)
c  in CNF:
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_2
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨  b^{81, 2}_1
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ -p_81 ∨ -b^{81, 2}_0
c  in DIMACS:
 18599  18600 -18601 -81 -18602 0
 18599  18600 -18601 -81  18603 0
 18599  18600 -18601 -81 -18604 0

c  2+1 --> break 
c    (-b^{81, 1}_2 ∧  b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧  p_81) -> break
c  in CNF:
c     b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ -p_81 ∨ break
c  in DIMACS:
 18599 -18600  18601 -81 1162 0


c  2-1 --> 1
c    (-b^{81, 1}_2 ∧  b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧ -p_81) -> (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0)
c  in CNF:
c     b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_2
c     b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_1
c     b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨  b^{81, 2}_0
c  in DIMACS:
 18599 -18600  18601  81 -18602 0
 18599 -18600  18601  81 -18603 0
 18599 -18600  18601  81  18604 0

c  1-1 --> 0
c    (-b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧  b^{81, 1}_0 ∧ -p_81) -> (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧ -b^{81, 2}_0)
c  in CNF:
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_2
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_1
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_0
c  in DIMACS:
 18599  18600 -18601  81 -18602 0
 18599  18600 -18601  81 -18603 0
 18599  18600 -18601  81 -18604 0

c  0-1 --> -1
c    (-b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧ -p_81) -> ( b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0)
c  in CNF:
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨  b^{81, 2}_2
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_1
c     b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨  b^{81, 2}_0
c  in DIMACS:
 18599  18600  18601  81  18602 0
 18599  18600  18601  81 -18603 0
 18599  18600  18601  81  18604 0

c  -1-1 --> -2
c    ( b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧  b^{81, 1}_0 ∧ -p_81) -> ( b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0)
c  in CNF:
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨  b^{81, 2}_2
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨  b^{81, 2}_1
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨  p_81 ∨ -b^{81, 2}_0
c  in DIMACS:
-18599  18600 -18601  81  18602 0
-18599  18600 -18601  81  18603 0
-18599  18600 -18601  81 -18604 0

c  -2-1 --> break 
c    ( b^{81, 1}_2 ∧  b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧ -p_81) -> break
c  in CNF:
c    -b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨  b^{81, 1}_0 ∨  p_81 ∨ break
c  in DIMACS:
-18599 -18600  18601  81 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 1}_2 ∧ -b^{81, 1}_1 ∧ -b^{81, 1}_0 ∧ true) 
c  in CNF:
c    -b^{81, 1}_2 ∨  b^{81, 1}_1 ∨  b^{81, 1}_0 ∨ false 
c  in DIMACS:
-18599  18600  18601  0

c  3 does not represent an automaton state.
c    -(-b^{81, 1}_2 ∧  b^{81, 1}_1 ∧  b^{81, 1}_0 ∧ true) 
c  in CNF:
c     b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ false 
c  in DIMACS:
 18599 -18600 -18601  0
c  -3 does not represent an automaton state.
c    -( b^{81, 1}_2 ∧  b^{81, 1}_1 ∧  b^{81, 1}_0 ∧ true) 
c  in CNF:
c    -b^{81, 1}_2 ∨ -b^{81, 1}_1 ∨ -b^{81, 1}_0 ∨ false 
c  in DIMACS:
-18599 -18600 -18601  0

c i = 2
c  -2+1 --> -1
c    ( b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧  p_162) -> ( b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0)
c  in CNF:
c    -b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨  b^{81, 3}_2
c    -b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_1
c    -b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨  b^{81, 3}_0
c  in DIMACS:
-18602 -18603  18604 -162  18605 0
-18602 -18603  18604 -162 -18606 0
-18602 -18603  18604 -162  18607 0

c  -1+1 --> 0
c    ( b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0 ∧  p_162) -> (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧ -b^{81, 3}_0)
c  in CNF:
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_2
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_1
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_0
c  in DIMACS:
-18602  18603 -18604 -162 -18605 0
-18602  18603 -18604 -162 -18606 0
-18602  18603 -18604 -162 -18607 0

c  0+1 --> 1
c    (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧  p_162) -> (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0)
c  in CNF:
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_2
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_1
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨  b^{81, 3}_0
c  in DIMACS:
 18602  18603  18604 -162 -18605 0
 18602  18603  18604 -162 -18606 0
 18602  18603  18604 -162  18607 0

c  1+1 --> 2
c    (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0 ∧  p_162) -> (-b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0)
c  in CNF:
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_2
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨  b^{81, 3}_1
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ -p_162 ∨ -b^{81, 3}_0
c  in DIMACS:
 18602  18603 -18604 -162 -18605 0
 18602  18603 -18604 -162  18606 0
 18602  18603 -18604 -162 -18607 0

c  2+1 --> break 
c    (-b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧  p_162) -> break
c  in CNF:
c     b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 18602 -18603  18604 -162 1162 0


c  2-1 --> 1
c    (-b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧ -p_162) -> (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0)
c  in CNF:
c     b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_2
c     b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_1
c     b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨  b^{81, 3}_0
c  in DIMACS:
 18602 -18603  18604  162 -18605 0
 18602 -18603  18604  162 -18606 0
 18602 -18603  18604  162  18607 0

c  1-1 --> 0
c    (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0 ∧ -p_162) -> (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧ -b^{81, 3}_0)
c  in CNF:
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_2
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_1
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_0
c  in DIMACS:
 18602  18603 -18604  162 -18605 0
 18602  18603 -18604  162 -18606 0
 18602  18603 -18604  162 -18607 0

c  0-1 --> -1
c    (-b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧ -p_162) -> ( b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0)
c  in CNF:
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨  b^{81, 3}_2
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_1
c     b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨  b^{81, 3}_0
c  in DIMACS:
 18602  18603  18604  162  18605 0
 18602  18603  18604  162 -18606 0
 18602  18603  18604  162  18607 0

c  -1-1 --> -2
c    ( b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧  b^{81, 2}_0 ∧ -p_162) -> ( b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0)
c  in CNF:
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨  b^{81, 3}_2
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨  b^{81, 3}_1
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨  p_162 ∨ -b^{81, 3}_0
c  in DIMACS:
-18602  18603 -18604  162  18605 0
-18602  18603 -18604  162  18606 0
-18602  18603 -18604  162 -18607 0

c  -2-1 --> break 
c    ( b^{81, 2}_2 ∧  b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨  b^{81, 2}_0 ∨  p_162 ∨ break
c  in DIMACS:
-18602 -18603  18604  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 2}_2 ∧ -b^{81, 2}_1 ∧ -b^{81, 2}_0 ∧ true) 
c  in CNF:
c    -b^{81, 2}_2 ∨  b^{81, 2}_1 ∨  b^{81, 2}_0 ∨ false 
c  in DIMACS:
-18602  18603  18604  0

c  3 does not represent an automaton state.
c    -(-b^{81, 2}_2 ∧  b^{81, 2}_1 ∧  b^{81, 2}_0 ∧ true) 
c  in CNF:
c     b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ false 
c  in DIMACS:
 18602 -18603 -18604  0
c  -3 does not represent an automaton state.
c    -( b^{81, 2}_2 ∧  b^{81, 2}_1 ∧  b^{81, 2}_0 ∧ true) 
c  in CNF:
c    -b^{81, 2}_2 ∨ -b^{81, 2}_1 ∨ -b^{81, 2}_0 ∨ false 
c  in DIMACS:
-18602 -18603 -18604  0

c i = 3
c  -2+1 --> -1
c    ( b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧  p_243) -> ( b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0)
c  in CNF:
c    -b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨  b^{81, 4}_2
c    -b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_1
c    -b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨  b^{81, 4}_0
c  in DIMACS:
-18605 -18606  18607 -243  18608 0
-18605 -18606  18607 -243 -18609 0
-18605 -18606  18607 -243  18610 0

c  -1+1 --> 0
c    ( b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0 ∧  p_243) -> (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧ -b^{81, 4}_0)
c  in CNF:
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_2
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_1
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_0
c  in DIMACS:
-18605  18606 -18607 -243 -18608 0
-18605  18606 -18607 -243 -18609 0
-18605  18606 -18607 -243 -18610 0

c  0+1 --> 1
c    (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧  p_243) -> (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0)
c  in CNF:
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_2
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_1
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨  b^{81, 4}_0
c  in DIMACS:
 18605  18606  18607 -243 -18608 0
 18605  18606  18607 -243 -18609 0
 18605  18606  18607 -243  18610 0

c  1+1 --> 2
c    (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0 ∧  p_243) -> (-b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0)
c  in CNF:
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_2
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨  b^{81, 4}_1
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ -p_243 ∨ -b^{81, 4}_0
c  in DIMACS:
 18605  18606 -18607 -243 -18608 0
 18605  18606 -18607 -243  18609 0
 18605  18606 -18607 -243 -18610 0

c  2+1 --> break 
c    (-b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧  p_243) -> break
c  in CNF:
c     b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 18605 -18606  18607 -243 1162 0


c  2-1 --> 1
c    (-b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧ -p_243) -> (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0)
c  in CNF:
c     b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_2
c     b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_1
c     b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨  b^{81, 4}_0
c  in DIMACS:
 18605 -18606  18607  243 -18608 0
 18605 -18606  18607  243 -18609 0
 18605 -18606  18607  243  18610 0

c  1-1 --> 0
c    (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0 ∧ -p_243) -> (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧ -b^{81, 4}_0)
c  in CNF:
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_2
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_1
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_0
c  in DIMACS:
 18605  18606 -18607  243 -18608 0
 18605  18606 -18607  243 -18609 0
 18605  18606 -18607  243 -18610 0

c  0-1 --> -1
c    (-b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧ -p_243) -> ( b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0)
c  in CNF:
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨  b^{81, 4}_2
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_1
c     b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨  b^{81, 4}_0
c  in DIMACS:
 18605  18606  18607  243  18608 0
 18605  18606  18607  243 -18609 0
 18605  18606  18607  243  18610 0

c  -1-1 --> -2
c    ( b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧  b^{81, 3}_0 ∧ -p_243) -> ( b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0)
c  in CNF:
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨  b^{81, 4}_2
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨  b^{81, 4}_1
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨  p_243 ∨ -b^{81, 4}_0
c  in DIMACS:
-18605  18606 -18607  243  18608 0
-18605  18606 -18607  243  18609 0
-18605  18606 -18607  243 -18610 0

c  -2-1 --> break 
c    ( b^{81, 3}_2 ∧  b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨  b^{81, 3}_0 ∨  p_243 ∨ break
c  in DIMACS:
-18605 -18606  18607  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 3}_2 ∧ -b^{81, 3}_1 ∧ -b^{81, 3}_0 ∧ true) 
c  in CNF:
c    -b^{81, 3}_2 ∨  b^{81, 3}_1 ∨  b^{81, 3}_0 ∨ false 
c  in DIMACS:
-18605  18606  18607  0

c  3 does not represent an automaton state.
c    -(-b^{81, 3}_2 ∧  b^{81, 3}_1 ∧  b^{81, 3}_0 ∧ true) 
c  in CNF:
c     b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ false 
c  in DIMACS:
 18605 -18606 -18607  0
c  -3 does not represent an automaton state.
c    -( b^{81, 3}_2 ∧  b^{81, 3}_1 ∧  b^{81, 3}_0 ∧ true) 
c  in CNF:
c    -b^{81, 3}_2 ∨ -b^{81, 3}_1 ∨ -b^{81, 3}_0 ∨ false 
c  in DIMACS:
-18605 -18606 -18607  0

c i = 4
c  -2+1 --> -1
c    ( b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧  p_324) -> ( b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0)
c  in CNF:
c    -b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨  b^{81, 5}_2
c    -b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_1
c    -b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨  b^{81, 5}_0
c  in DIMACS:
-18608 -18609  18610 -324  18611 0
-18608 -18609  18610 -324 -18612 0
-18608 -18609  18610 -324  18613 0

c  -1+1 --> 0
c    ( b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0 ∧  p_324) -> (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧ -b^{81, 5}_0)
c  in CNF:
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_2
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_1
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_0
c  in DIMACS:
-18608  18609 -18610 -324 -18611 0
-18608  18609 -18610 -324 -18612 0
-18608  18609 -18610 -324 -18613 0

c  0+1 --> 1
c    (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧  p_324) -> (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0)
c  in CNF:
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_2
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_1
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨  b^{81, 5}_0
c  in DIMACS:
 18608  18609  18610 -324 -18611 0
 18608  18609  18610 -324 -18612 0
 18608  18609  18610 -324  18613 0

c  1+1 --> 2
c    (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0 ∧  p_324) -> (-b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0)
c  in CNF:
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_2
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨  b^{81, 5}_1
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ -p_324 ∨ -b^{81, 5}_0
c  in DIMACS:
 18608  18609 -18610 -324 -18611 0
 18608  18609 -18610 -324  18612 0
 18608  18609 -18610 -324 -18613 0

c  2+1 --> break 
c    (-b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧  p_324) -> break
c  in CNF:
c     b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 18608 -18609  18610 -324 1162 0


c  2-1 --> 1
c    (-b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧ -p_324) -> (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0)
c  in CNF:
c     b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_2
c     b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_1
c     b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨  b^{81, 5}_0
c  in DIMACS:
 18608 -18609  18610  324 -18611 0
 18608 -18609  18610  324 -18612 0
 18608 -18609  18610  324  18613 0

c  1-1 --> 0
c    (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0 ∧ -p_324) -> (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧ -b^{81, 5}_0)
c  in CNF:
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_2
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_1
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_0
c  in DIMACS:
 18608  18609 -18610  324 -18611 0
 18608  18609 -18610  324 -18612 0
 18608  18609 -18610  324 -18613 0

c  0-1 --> -1
c    (-b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧ -p_324) -> ( b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0)
c  in CNF:
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨  b^{81, 5}_2
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_1
c     b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨  b^{81, 5}_0
c  in DIMACS:
 18608  18609  18610  324  18611 0
 18608  18609  18610  324 -18612 0
 18608  18609  18610  324  18613 0

c  -1-1 --> -2
c    ( b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧  b^{81, 4}_0 ∧ -p_324) -> ( b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0)
c  in CNF:
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨  b^{81, 5}_2
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨  b^{81, 5}_1
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨  p_324 ∨ -b^{81, 5}_0
c  in DIMACS:
-18608  18609 -18610  324  18611 0
-18608  18609 -18610  324  18612 0
-18608  18609 -18610  324 -18613 0

c  -2-1 --> break 
c    ( b^{81, 4}_2 ∧  b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨  b^{81, 4}_0 ∨  p_324 ∨ break
c  in DIMACS:
-18608 -18609  18610  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 4}_2 ∧ -b^{81, 4}_1 ∧ -b^{81, 4}_0 ∧ true) 
c  in CNF:
c    -b^{81, 4}_2 ∨  b^{81, 4}_1 ∨  b^{81, 4}_0 ∨ false 
c  in DIMACS:
-18608  18609  18610  0

c  3 does not represent an automaton state.
c    -(-b^{81, 4}_2 ∧  b^{81, 4}_1 ∧  b^{81, 4}_0 ∧ true) 
c  in CNF:
c     b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ false 
c  in DIMACS:
 18608 -18609 -18610  0
c  -3 does not represent an automaton state.
c    -( b^{81, 4}_2 ∧  b^{81, 4}_1 ∧  b^{81, 4}_0 ∧ true) 
c  in CNF:
c    -b^{81, 4}_2 ∨ -b^{81, 4}_1 ∨ -b^{81, 4}_0 ∨ false 
c  in DIMACS:
-18608 -18609 -18610  0

c i = 5
c  -2+1 --> -1
c    ( b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧  p_405) -> ( b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0)
c  in CNF:
c    -b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨  b^{81, 6}_2
c    -b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_1
c    -b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨  b^{81, 6}_0
c  in DIMACS:
-18611 -18612  18613 -405  18614 0
-18611 -18612  18613 -405 -18615 0
-18611 -18612  18613 -405  18616 0

c  -1+1 --> 0
c    ( b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0 ∧  p_405) -> (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧ -b^{81, 6}_0)
c  in CNF:
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_2
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_1
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_0
c  in DIMACS:
-18611  18612 -18613 -405 -18614 0
-18611  18612 -18613 -405 -18615 0
-18611  18612 -18613 -405 -18616 0

c  0+1 --> 1
c    (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧  p_405) -> (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0)
c  in CNF:
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_2
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_1
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨  b^{81, 6}_0
c  in DIMACS:
 18611  18612  18613 -405 -18614 0
 18611  18612  18613 -405 -18615 0
 18611  18612  18613 -405  18616 0

c  1+1 --> 2
c    (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0 ∧  p_405) -> (-b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0)
c  in CNF:
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_2
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨  b^{81, 6}_1
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ -p_405 ∨ -b^{81, 6}_0
c  in DIMACS:
 18611  18612 -18613 -405 -18614 0
 18611  18612 -18613 -405  18615 0
 18611  18612 -18613 -405 -18616 0

c  2+1 --> break 
c    (-b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧  p_405) -> break
c  in CNF:
c     b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 18611 -18612  18613 -405 1162 0


c  2-1 --> 1
c    (-b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧ -p_405) -> (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0)
c  in CNF:
c     b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_2
c     b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_1
c     b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨  b^{81, 6}_0
c  in DIMACS:
 18611 -18612  18613  405 -18614 0
 18611 -18612  18613  405 -18615 0
 18611 -18612  18613  405  18616 0

c  1-1 --> 0
c    (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0 ∧ -p_405) -> (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧ -b^{81, 6}_0)
c  in CNF:
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_2
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_1
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_0
c  in DIMACS:
 18611  18612 -18613  405 -18614 0
 18611  18612 -18613  405 -18615 0
 18611  18612 -18613  405 -18616 0

c  0-1 --> -1
c    (-b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧ -p_405) -> ( b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0)
c  in CNF:
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨  b^{81, 6}_2
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_1
c     b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨  b^{81, 6}_0
c  in DIMACS:
 18611  18612  18613  405  18614 0
 18611  18612  18613  405 -18615 0
 18611  18612  18613  405  18616 0

c  -1-1 --> -2
c    ( b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧  b^{81, 5}_0 ∧ -p_405) -> ( b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0)
c  in CNF:
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨  b^{81, 6}_2
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨  b^{81, 6}_1
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨  p_405 ∨ -b^{81, 6}_0
c  in DIMACS:
-18611  18612 -18613  405  18614 0
-18611  18612 -18613  405  18615 0
-18611  18612 -18613  405 -18616 0

c  -2-1 --> break 
c    ( b^{81, 5}_2 ∧  b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨  b^{81, 5}_0 ∨  p_405 ∨ break
c  in DIMACS:
-18611 -18612  18613  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 5}_2 ∧ -b^{81, 5}_1 ∧ -b^{81, 5}_0 ∧ true) 
c  in CNF:
c    -b^{81, 5}_2 ∨  b^{81, 5}_1 ∨  b^{81, 5}_0 ∨ false 
c  in DIMACS:
-18611  18612  18613  0

c  3 does not represent an automaton state.
c    -(-b^{81, 5}_2 ∧  b^{81, 5}_1 ∧  b^{81, 5}_0 ∧ true) 
c  in CNF:
c     b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ false 
c  in DIMACS:
 18611 -18612 -18613  0
c  -3 does not represent an automaton state.
c    -( b^{81, 5}_2 ∧  b^{81, 5}_1 ∧  b^{81, 5}_0 ∧ true) 
c  in CNF:
c    -b^{81, 5}_2 ∨ -b^{81, 5}_1 ∨ -b^{81, 5}_0 ∨ false 
c  in DIMACS:
-18611 -18612 -18613  0

c i = 6
c  -2+1 --> -1
c    ( b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧  p_486) -> ( b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0)
c  in CNF:
c    -b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨  b^{81, 7}_2
c    -b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_1
c    -b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨  b^{81, 7}_0
c  in DIMACS:
-18614 -18615  18616 -486  18617 0
-18614 -18615  18616 -486 -18618 0
-18614 -18615  18616 -486  18619 0

c  -1+1 --> 0
c    ( b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0 ∧  p_486) -> (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧ -b^{81, 7}_0)
c  in CNF:
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_2
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_1
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_0
c  in DIMACS:
-18614  18615 -18616 -486 -18617 0
-18614  18615 -18616 -486 -18618 0
-18614  18615 -18616 -486 -18619 0

c  0+1 --> 1
c    (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧  p_486) -> (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0)
c  in CNF:
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_2
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_1
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨  b^{81, 7}_0
c  in DIMACS:
 18614  18615  18616 -486 -18617 0
 18614  18615  18616 -486 -18618 0
 18614  18615  18616 -486  18619 0

c  1+1 --> 2
c    (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0 ∧  p_486) -> (-b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0)
c  in CNF:
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_2
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨  b^{81, 7}_1
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ -p_486 ∨ -b^{81, 7}_0
c  in DIMACS:
 18614  18615 -18616 -486 -18617 0
 18614  18615 -18616 -486  18618 0
 18614  18615 -18616 -486 -18619 0

c  2+1 --> break 
c    (-b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧  p_486) -> break
c  in CNF:
c     b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 18614 -18615  18616 -486 1162 0


c  2-1 --> 1
c    (-b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧ -p_486) -> (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0)
c  in CNF:
c     b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_2
c     b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_1
c     b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨  b^{81, 7}_0
c  in DIMACS:
 18614 -18615  18616  486 -18617 0
 18614 -18615  18616  486 -18618 0
 18614 -18615  18616  486  18619 0

c  1-1 --> 0
c    (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0 ∧ -p_486) -> (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧ -b^{81, 7}_0)
c  in CNF:
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_2
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_1
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_0
c  in DIMACS:
 18614  18615 -18616  486 -18617 0
 18614  18615 -18616  486 -18618 0
 18614  18615 -18616  486 -18619 0

c  0-1 --> -1
c    (-b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧ -p_486) -> ( b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0)
c  in CNF:
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨  b^{81, 7}_2
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_1
c     b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨  b^{81, 7}_0
c  in DIMACS:
 18614  18615  18616  486  18617 0
 18614  18615  18616  486 -18618 0
 18614  18615  18616  486  18619 0

c  -1-1 --> -2
c    ( b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧  b^{81, 6}_0 ∧ -p_486) -> ( b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0)
c  in CNF:
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨  b^{81, 7}_2
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨  b^{81, 7}_1
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨  p_486 ∨ -b^{81, 7}_0
c  in DIMACS:
-18614  18615 -18616  486  18617 0
-18614  18615 -18616  486  18618 0
-18614  18615 -18616  486 -18619 0

c  -2-1 --> break 
c    ( b^{81, 6}_2 ∧  b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨  b^{81, 6}_0 ∨  p_486 ∨ break
c  in DIMACS:
-18614 -18615  18616  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 6}_2 ∧ -b^{81, 6}_1 ∧ -b^{81, 6}_0 ∧ true) 
c  in CNF:
c    -b^{81, 6}_2 ∨  b^{81, 6}_1 ∨  b^{81, 6}_0 ∨ false 
c  in DIMACS:
-18614  18615  18616  0

c  3 does not represent an automaton state.
c    -(-b^{81, 6}_2 ∧  b^{81, 6}_1 ∧  b^{81, 6}_0 ∧ true) 
c  in CNF:
c     b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ false 
c  in DIMACS:
 18614 -18615 -18616  0
c  -3 does not represent an automaton state.
c    -( b^{81, 6}_2 ∧  b^{81, 6}_1 ∧  b^{81, 6}_0 ∧ true) 
c  in CNF:
c    -b^{81, 6}_2 ∨ -b^{81, 6}_1 ∨ -b^{81, 6}_0 ∨ false 
c  in DIMACS:
-18614 -18615 -18616  0

c i = 7
c  -2+1 --> -1
c    ( b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧  p_567) -> ( b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0)
c  in CNF:
c    -b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨  b^{81, 8}_2
c    -b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_1
c    -b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨  b^{81, 8}_0
c  in DIMACS:
-18617 -18618  18619 -567  18620 0
-18617 -18618  18619 -567 -18621 0
-18617 -18618  18619 -567  18622 0

c  -1+1 --> 0
c    ( b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0 ∧  p_567) -> (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧ -b^{81, 8}_0)
c  in CNF:
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_2
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_1
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_0
c  in DIMACS:
-18617  18618 -18619 -567 -18620 0
-18617  18618 -18619 -567 -18621 0
-18617  18618 -18619 -567 -18622 0

c  0+1 --> 1
c    (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧  p_567) -> (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0)
c  in CNF:
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_2
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_1
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨  b^{81, 8}_0
c  in DIMACS:
 18617  18618  18619 -567 -18620 0
 18617  18618  18619 -567 -18621 0
 18617  18618  18619 -567  18622 0

c  1+1 --> 2
c    (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0 ∧  p_567) -> (-b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0)
c  in CNF:
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_2
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨  b^{81, 8}_1
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ -p_567 ∨ -b^{81, 8}_0
c  in DIMACS:
 18617  18618 -18619 -567 -18620 0
 18617  18618 -18619 -567  18621 0
 18617  18618 -18619 -567 -18622 0

c  2+1 --> break 
c    (-b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧  p_567) -> break
c  in CNF:
c     b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 18617 -18618  18619 -567 1162 0


c  2-1 --> 1
c    (-b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧ -p_567) -> (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0)
c  in CNF:
c     b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_2
c     b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_1
c     b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨  b^{81, 8}_0
c  in DIMACS:
 18617 -18618  18619  567 -18620 0
 18617 -18618  18619  567 -18621 0
 18617 -18618  18619  567  18622 0

c  1-1 --> 0
c    (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0 ∧ -p_567) -> (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧ -b^{81, 8}_0)
c  in CNF:
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_2
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_1
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_0
c  in DIMACS:
 18617  18618 -18619  567 -18620 0
 18617  18618 -18619  567 -18621 0
 18617  18618 -18619  567 -18622 0

c  0-1 --> -1
c    (-b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧ -p_567) -> ( b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0)
c  in CNF:
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨  b^{81, 8}_2
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_1
c     b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨  b^{81, 8}_0
c  in DIMACS:
 18617  18618  18619  567  18620 0
 18617  18618  18619  567 -18621 0
 18617  18618  18619  567  18622 0

c  -1-1 --> -2
c    ( b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧  b^{81, 7}_0 ∧ -p_567) -> ( b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0)
c  in CNF:
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨  b^{81, 8}_2
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨  b^{81, 8}_1
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨  p_567 ∨ -b^{81, 8}_0
c  in DIMACS:
-18617  18618 -18619  567  18620 0
-18617  18618 -18619  567  18621 0
-18617  18618 -18619  567 -18622 0

c  -2-1 --> break 
c    ( b^{81, 7}_2 ∧  b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨  b^{81, 7}_0 ∨  p_567 ∨ break
c  in DIMACS:
-18617 -18618  18619  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 7}_2 ∧ -b^{81, 7}_1 ∧ -b^{81, 7}_0 ∧ true) 
c  in CNF:
c    -b^{81, 7}_2 ∨  b^{81, 7}_1 ∨  b^{81, 7}_0 ∨ false 
c  in DIMACS:
-18617  18618  18619  0

c  3 does not represent an automaton state.
c    -(-b^{81, 7}_2 ∧  b^{81, 7}_1 ∧  b^{81, 7}_0 ∧ true) 
c  in CNF:
c     b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ false 
c  in DIMACS:
 18617 -18618 -18619  0
c  -3 does not represent an automaton state.
c    -( b^{81, 7}_2 ∧  b^{81, 7}_1 ∧  b^{81, 7}_0 ∧ true) 
c  in CNF:
c    -b^{81, 7}_2 ∨ -b^{81, 7}_1 ∨ -b^{81, 7}_0 ∨ false 
c  in DIMACS:
-18617 -18618 -18619  0

c i = 8
c  -2+1 --> -1
c    ( b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧  p_648) -> ( b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0)
c  in CNF:
c    -b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨  b^{81, 9}_2
c    -b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_1
c    -b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨  b^{81, 9}_0
c  in DIMACS:
-18620 -18621  18622 -648  18623 0
-18620 -18621  18622 -648 -18624 0
-18620 -18621  18622 -648  18625 0

c  -1+1 --> 0
c    ( b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0 ∧  p_648) -> (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧ -b^{81, 9}_0)
c  in CNF:
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_2
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_1
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_0
c  in DIMACS:
-18620  18621 -18622 -648 -18623 0
-18620  18621 -18622 -648 -18624 0
-18620  18621 -18622 -648 -18625 0

c  0+1 --> 1
c    (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧  p_648) -> (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0)
c  in CNF:
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_2
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_1
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨  b^{81, 9}_0
c  in DIMACS:
 18620  18621  18622 -648 -18623 0
 18620  18621  18622 -648 -18624 0
 18620  18621  18622 -648  18625 0

c  1+1 --> 2
c    (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0 ∧  p_648) -> (-b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0)
c  in CNF:
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_2
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨  b^{81, 9}_1
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ -p_648 ∨ -b^{81, 9}_0
c  in DIMACS:
 18620  18621 -18622 -648 -18623 0
 18620  18621 -18622 -648  18624 0
 18620  18621 -18622 -648 -18625 0

c  2+1 --> break 
c    (-b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧  p_648) -> break
c  in CNF:
c     b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 18620 -18621  18622 -648 1162 0


c  2-1 --> 1
c    (-b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧ -p_648) -> (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0)
c  in CNF:
c     b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_2
c     b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_1
c     b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨  b^{81, 9}_0
c  in DIMACS:
 18620 -18621  18622  648 -18623 0
 18620 -18621  18622  648 -18624 0
 18620 -18621  18622  648  18625 0

c  1-1 --> 0
c    (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0 ∧ -p_648) -> (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧ -b^{81, 9}_0)
c  in CNF:
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_2
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_1
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_0
c  in DIMACS:
 18620  18621 -18622  648 -18623 0
 18620  18621 -18622  648 -18624 0
 18620  18621 -18622  648 -18625 0

c  0-1 --> -1
c    (-b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧ -p_648) -> ( b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0)
c  in CNF:
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨  b^{81, 9}_2
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_1
c     b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨  b^{81, 9}_0
c  in DIMACS:
 18620  18621  18622  648  18623 0
 18620  18621  18622  648 -18624 0
 18620  18621  18622  648  18625 0

c  -1-1 --> -2
c    ( b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧  b^{81, 8}_0 ∧ -p_648) -> ( b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0)
c  in CNF:
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨  b^{81, 9}_2
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨  b^{81, 9}_1
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨  p_648 ∨ -b^{81, 9}_0
c  in DIMACS:
-18620  18621 -18622  648  18623 0
-18620  18621 -18622  648  18624 0
-18620  18621 -18622  648 -18625 0

c  -2-1 --> break 
c    ( b^{81, 8}_2 ∧  b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨  b^{81, 8}_0 ∨  p_648 ∨ break
c  in DIMACS:
-18620 -18621  18622  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 8}_2 ∧ -b^{81, 8}_1 ∧ -b^{81, 8}_0 ∧ true) 
c  in CNF:
c    -b^{81, 8}_2 ∨  b^{81, 8}_1 ∨  b^{81, 8}_0 ∨ false 
c  in DIMACS:
-18620  18621  18622  0

c  3 does not represent an automaton state.
c    -(-b^{81, 8}_2 ∧  b^{81, 8}_1 ∧  b^{81, 8}_0 ∧ true) 
c  in CNF:
c     b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ false 
c  in DIMACS:
 18620 -18621 -18622  0
c  -3 does not represent an automaton state.
c    -( b^{81, 8}_2 ∧  b^{81, 8}_1 ∧  b^{81, 8}_0 ∧ true) 
c  in CNF:
c    -b^{81, 8}_2 ∨ -b^{81, 8}_1 ∨ -b^{81, 8}_0 ∨ false 
c  in DIMACS:
-18620 -18621 -18622  0

c i = 9
c  -2+1 --> -1
c    ( b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧  p_729) -> ( b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0)
c  in CNF:
c    -b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨  b^{81, 10}_2
c    -b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_1
c    -b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨  b^{81, 10}_0
c  in DIMACS:
-18623 -18624  18625 -729  18626 0
-18623 -18624  18625 -729 -18627 0
-18623 -18624  18625 -729  18628 0

c  -1+1 --> 0
c    ( b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0 ∧  p_729) -> (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧ -b^{81, 10}_0)
c  in CNF:
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_2
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_1
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_0
c  in DIMACS:
-18623  18624 -18625 -729 -18626 0
-18623  18624 -18625 -729 -18627 0
-18623  18624 -18625 -729 -18628 0

c  0+1 --> 1
c    (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧  p_729) -> (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0)
c  in CNF:
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_2
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_1
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨  b^{81, 10}_0
c  in DIMACS:
 18623  18624  18625 -729 -18626 0
 18623  18624  18625 -729 -18627 0
 18623  18624  18625 -729  18628 0

c  1+1 --> 2
c    (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0 ∧  p_729) -> (-b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0)
c  in CNF:
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_2
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨  b^{81, 10}_1
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ -p_729 ∨ -b^{81, 10}_0
c  in DIMACS:
 18623  18624 -18625 -729 -18626 0
 18623  18624 -18625 -729  18627 0
 18623  18624 -18625 -729 -18628 0

c  2+1 --> break 
c    (-b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧  p_729) -> break
c  in CNF:
c     b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 18623 -18624  18625 -729 1162 0


c  2-1 --> 1
c    (-b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧ -p_729) -> (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0)
c  in CNF:
c     b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_2
c     b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_1
c     b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨  b^{81, 10}_0
c  in DIMACS:
 18623 -18624  18625  729 -18626 0
 18623 -18624  18625  729 -18627 0
 18623 -18624  18625  729  18628 0

c  1-1 --> 0
c    (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0 ∧ -p_729) -> (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧ -b^{81, 10}_0)
c  in CNF:
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_2
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_1
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_0
c  in DIMACS:
 18623  18624 -18625  729 -18626 0
 18623  18624 -18625  729 -18627 0
 18623  18624 -18625  729 -18628 0

c  0-1 --> -1
c    (-b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧ -p_729) -> ( b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0)
c  in CNF:
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨  b^{81, 10}_2
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_1
c     b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨  b^{81, 10}_0
c  in DIMACS:
 18623  18624  18625  729  18626 0
 18623  18624  18625  729 -18627 0
 18623  18624  18625  729  18628 0

c  -1-1 --> -2
c    ( b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧  b^{81, 9}_0 ∧ -p_729) -> ( b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0)
c  in CNF:
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨  b^{81, 10}_2
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨  b^{81, 10}_1
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨  p_729 ∨ -b^{81, 10}_0
c  in DIMACS:
-18623  18624 -18625  729  18626 0
-18623  18624 -18625  729  18627 0
-18623  18624 -18625  729 -18628 0

c  -2-1 --> break 
c    ( b^{81, 9}_2 ∧  b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨  b^{81, 9}_0 ∨  p_729 ∨ break
c  in DIMACS:
-18623 -18624  18625  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 9}_2 ∧ -b^{81, 9}_1 ∧ -b^{81, 9}_0 ∧ true) 
c  in CNF:
c    -b^{81, 9}_2 ∨  b^{81, 9}_1 ∨  b^{81, 9}_0 ∨ false 
c  in DIMACS:
-18623  18624  18625  0

c  3 does not represent an automaton state.
c    -(-b^{81, 9}_2 ∧  b^{81, 9}_1 ∧  b^{81, 9}_0 ∧ true) 
c  in CNF:
c     b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ false 
c  in DIMACS:
 18623 -18624 -18625  0
c  -3 does not represent an automaton state.
c    -( b^{81, 9}_2 ∧  b^{81, 9}_1 ∧  b^{81, 9}_0 ∧ true) 
c  in CNF:
c    -b^{81, 9}_2 ∨ -b^{81, 9}_1 ∨ -b^{81, 9}_0 ∨ false 
c  in DIMACS:
-18623 -18624 -18625  0

c i = 10
c  -2+1 --> -1
c    ( b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧  p_810) -> ( b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0)
c  in CNF:
c    -b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨  b^{81, 11}_2
c    -b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_1
c    -b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨  b^{81, 11}_0
c  in DIMACS:
-18626 -18627  18628 -810  18629 0
-18626 -18627  18628 -810 -18630 0
-18626 -18627  18628 -810  18631 0

c  -1+1 --> 0
c    ( b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0 ∧  p_810) -> (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧ -b^{81, 11}_0)
c  in CNF:
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_2
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_1
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_0
c  in DIMACS:
-18626  18627 -18628 -810 -18629 0
-18626  18627 -18628 -810 -18630 0
-18626  18627 -18628 -810 -18631 0

c  0+1 --> 1
c    (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧  p_810) -> (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0)
c  in CNF:
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_2
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_1
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨  b^{81, 11}_0
c  in DIMACS:
 18626  18627  18628 -810 -18629 0
 18626  18627  18628 -810 -18630 0
 18626  18627  18628 -810  18631 0

c  1+1 --> 2
c    (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0 ∧  p_810) -> (-b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0)
c  in CNF:
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_2
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨  b^{81, 11}_1
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ -p_810 ∨ -b^{81, 11}_0
c  in DIMACS:
 18626  18627 -18628 -810 -18629 0
 18626  18627 -18628 -810  18630 0
 18626  18627 -18628 -810 -18631 0

c  2+1 --> break 
c    (-b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧  p_810) -> break
c  in CNF:
c     b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 18626 -18627  18628 -810 1162 0


c  2-1 --> 1
c    (-b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧ -p_810) -> (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0)
c  in CNF:
c     b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_2
c     b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_1
c     b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨  b^{81, 11}_0
c  in DIMACS:
 18626 -18627  18628  810 -18629 0
 18626 -18627  18628  810 -18630 0
 18626 -18627  18628  810  18631 0

c  1-1 --> 0
c    (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0 ∧ -p_810) -> (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧ -b^{81, 11}_0)
c  in CNF:
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_2
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_1
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_0
c  in DIMACS:
 18626  18627 -18628  810 -18629 0
 18626  18627 -18628  810 -18630 0
 18626  18627 -18628  810 -18631 0

c  0-1 --> -1
c    (-b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧ -p_810) -> ( b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0)
c  in CNF:
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨  b^{81, 11}_2
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_1
c     b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨  b^{81, 11}_0
c  in DIMACS:
 18626  18627  18628  810  18629 0
 18626  18627  18628  810 -18630 0
 18626  18627  18628  810  18631 0

c  -1-1 --> -2
c    ( b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧  b^{81, 10}_0 ∧ -p_810) -> ( b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0)
c  in CNF:
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨  b^{81, 11}_2
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨  b^{81, 11}_1
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨  p_810 ∨ -b^{81, 11}_0
c  in DIMACS:
-18626  18627 -18628  810  18629 0
-18626  18627 -18628  810  18630 0
-18626  18627 -18628  810 -18631 0

c  -2-1 --> break 
c    ( b^{81, 10}_2 ∧  b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨  b^{81, 10}_0 ∨  p_810 ∨ break
c  in DIMACS:
-18626 -18627  18628  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 10}_2 ∧ -b^{81, 10}_1 ∧ -b^{81, 10}_0 ∧ true) 
c  in CNF:
c    -b^{81, 10}_2 ∨  b^{81, 10}_1 ∨  b^{81, 10}_0 ∨ false 
c  in DIMACS:
-18626  18627  18628  0

c  3 does not represent an automaton state.
c    -(-b^{81, 10}_2 ∧  b^{81, 10}_1 ∧  b^{81, 10}_0 ∧ true) 
c  in CNF:
c     b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ false 
c  in DIMACS:
 18626 -18627 -18628  0
c  -3 does not represent an automaton state.
c    -( b^{81, 10}_2 ∧  b^{81, 10}_1 ∧  b^{81, 10}_0 ∧ true) 
c  in CNF:
c    -b^{81, 10}_2 ∨ -b^{81, 10}_1 ∨ -b^{81, 10}_0 ∨ false 
c  in DIMACS:
-18626 -18627 -18628  0

c i = 11
c  -2+1 --> -1
c    ( b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧  p_891) -> ( b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0)
c  in CNF:
c    -b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨  b^{81, 12}_2
c    -b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_1
c    -b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨  b^{81, 12}_0
c  in DIMACS:
-18629 -18630  18631 -891  18632 0
-18629 -18630  18631 -891 -18633 0
-18629 -18630  18631 -891  18634 0

c  -1+1 --> 0
c    ( b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0 ∧  p_891) -> (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧ -b^{81, 12}_0)
c  in CNF:
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_2
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_1
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_0
c  in DIMACS:
-18629  18630 -18631 -891 -18632 0
-18629  18630 -18631 -891 -18633 0
-18629  18630 -18631 -891 -18634 0

c  0+1 --> 1
c    (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧  p_891) -> (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0)
c  in CNF:
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_2
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_1
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨  b^{81, 12}_0
c  in DIMACS:
 18629  18630  18631 -891 -18632 0
 18629  18630  18631 -891 -18633 0
 18629  18630  18631 -891  18634 0

c  1+1 --> 2
c    (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0 ∧  p_891) -> (-b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0)
c  in CNF:
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_2
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨  b^{81, 12}_1
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ -p_891 ∨ -b^{81, 12}_0
c  in DIMACS:
 18629  18630 -18631 -891 -18632 0
 18629  18630 -18631 -891  18633 0
 18629  18630 -18631 -891 -18634 0

c  2+1 --> break 
c    (-b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧  p_891) -> break
c  in CNF:
c     b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 18629 -18630  18631 -891 1162 0


c  2-1 --> 1
c    (-b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧ -p_891) -> (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0)
c  in CNF:
c     b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_2
c     b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_1
c     b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨  b^{81, 12}_0
c  in DIMACS:
 18629 -18630  18631  891 -18632 0
 18629 -18630  18631  891 -18633 0
 18629 -18630  18631  891  18634 0

c  1-1 --> 0
c    (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0 ∧ -p_891) -> (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧ -b^{81, 12}_0)
c  in CNF:
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_2
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_1
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_0
c  in DIMACS:
 18629  18630 -18631  891 -18632 0
 18629  18630 -18631  891 -18633 0
 18629  18630 -18631  891 -18634 0

c  0-1 --> -1
c    (-b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧ -p_891) -> ( b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0)
c  in CNF:
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨  b^{81, 12}_2
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_1
c     b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨  b^{81, 12}_0
c  in DIMACS:
 18629  18630  18631  891  18632 0
 18629  18630  18631  891 -18633 0
 18629  18630  18631  891  18634 0

c  -1-1 --> -2
c    ( b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧  b^{81, 11}_0 ∧ -p_891) -> ( b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0)
c  in CNF:
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨  b^{81, 12}_2
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨  b^{81, 12}_1
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨  p_891 ∨ -b^{81, 12}_0
c  in DIMACS:
-18629  18630 -18631  891  18632 0
-18629  18630 -18631  891  18633 0
-18629  18630 -18631  891 -18634 0

c  -2-1 --> break 
c    ( b^{81, 11}_2 ∧  b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨  b^{81, 11}_0 ∨  p_891 ∨ break
c  in DIMACS:
-18629 -18630  18631  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 11}_2 ∧ -b^{81, 11}_1 ∧ -b^{81, 11}_0 ∧ true) 
c  in CNF:
c    -b^{81, 11}_2 ∨  b^{81, 11}_1 ∨  b^{81, 11}_0 ∨ false 
c  in DIMACS:
-18629  18630  18631  0

c  3 does not represent an automaton state.
c    -(-b^{81, 11}_2 ∧  b^{81, 11}_1 ∧  b^{81, 11}_0 ∧ true) 
c  in CNF:
c     b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ false 
c  in DIMACS:
 18629 -18630 -18631  0
c  -3 does not represent an automaton state.
c    -( b^{81, 11}_2 ∧  b^{81, 11}_1 ∧  b^{81, 11}_0 ∧ true) 
c  in CNF:
c    -b^{81, 11}_2 ∨ -b^{81, 11}_1 ∨ -b^{81, 11}_0 ∨ false 
c  in DIMACS:
-18629 -18630 -18631  0

c i = 12
c  -2+1 --> -1
c    ( b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧  p_972) -> ( b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0)
c  in CNF:
c    -b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨  b^{81, 13}_2
c    -b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_1
c    -b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨  b^{81, 13}_0
c  in DIMACS:
-18632 -18633  18634 -972  18635 0
-18632 -18633  18634 -972 -18636 0
-18632 -18633  18634 -972  18637 0

c  -1+1 --> 0
c    ( b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0 ∧  p_972) -> (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧ -b^{81, 13}_0)
c  in CNF:
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_2
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_1
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_0
c  in DIMACS:
-18632  18633 -18634 -972 -18635 0
-18632  18633 -18634 -972 -18636 0
-18632  18633 -18634 -972 -18637 0

c  0+1 --> 1
c    (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧  p_972) -> (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0)
c  in CNF:
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_2
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_1
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨  b^{81, 13}_0
c  in DIMACS:
 18632  18633  18634 -972 -18635 0
 18632  18633  18634 -972 -18636 0
 18632  18633  18634 -972  18637 0

c  1+1 --> 2
c    (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0 ∧  p_972) -> (-b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0)
c  in CNF:
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_2
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨  b^{81, 13}_1
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ -p_972 ∨ -b^{81, 13}_0
c  in DIMACS:
 18632  18633 -18634 -972 -18635 0
 18632  18633 -18634 -972  18636 0
 18632  18633 -18634 -972 -18637 0

c  2+1 --> break 
c    (-b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧  p_972) -> break
c  in CNF:
c     b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 18632 -18633  18634 -972 1162 0


c  2-1 --> 1
c    (-b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧ -p_972) -> (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0)
c  in CNF:
c     b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_2
c     b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_1
c     b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨  b^{81, 13}_0
c  in DIMACS:
 18632 -18633  18634  972 -18635 0
 18632 -18633  18634  972 -18636 0
 18632 -18633  18634  972  18637 0

c  1-1 --> 0
c    (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0 ∧ -p_972) -> (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧ -b^{81, 13}_0)
c  in CNF:
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_2
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_1
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_0
c  in DIMACS:
 18632  18633 -18634  972 -18635 0
 18632  18633 -18634  972 -18636 0
 18632  18633 -18634  972 -18637 0

c  0-1 --> -1
c    (-b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧ -p_972) -> ( b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0)
c  in CNF:
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨  b^{81, 13}_2
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_1
c     b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨  b^{81, 13}_0
c  in DIMACS:
 18632  18633  18634  972  18635 0
 18632  18633  18634  972 -18636 0
 18632  18633  18634  972  18637 0

c  -1-1 --> -2
c    ( b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧  b^{81, 12}_0 ∧ -p_972) -> ( b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0)
c  in CNF:
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨  b^{81, 13}_2
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨  b^{81, 13}_1
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨  p_972 ∨ -b^{81, 13}_0
c  in DIMACS:
-18632  18633 -18634  972  18635 0
-18632  18633 -18634  972  18636 0
-18632  18633 -18634  972 -18637 0

c  -2-1 --> break 
c    ( b^{81, 12}_2 ∧  b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨  b^{81, 12}_0 ∨  p_972 ∨ break
c  in DIMACS:
-18632 -18633  18634  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 12}_2 ∧ -b^{81, 12}_1 ∧ -b^{81, 12}_0 ∧ true) 
c  in CNF:
c    -b^{81, 12}_2 ∨  b^{81, 12}_1 ∨  b^{81, 12}_0 ∨ false 
c  in DIMACS:
-18632  18633  18634  0

c  3 does not represent an automaton state.
c    -(-b^{81, 12}_2 ∧  b^{81, 12}_1 ∧  b^{81, 12}_0 ∧ true) 
c  in CNF:
c     b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ false 
c  in DIMACS:
 18632 -18633 -18634  0
c  -3 does not represent an automaton state.
c    -( b^{81, 12}_2 ∧  b^{81, 12}_1 ∧  b^{81, 12}_0 ∧ true) 
c  in CNF:
c    -b^{81, 12}_2 ∨ -b^{81, 12}_1 ∨ -b^{81, 12}_0 ∨ false 
c  in DIMACS:
-18632 -18633 -18634  0

c i = 13
c  -2+1 --> -1
c    ( b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧  p_1053) -> ( b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0)
c  in CNF:
c    -b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨  b^{81, 14}_2
c    -b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_1
c    -b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨  b^{81, 14}_0
c  in DIMACS:
-18635 -18636  18637 -1053  18638 0
-18635 -18636  18637 -1053 -18639 0
-18635 -18636  18637 -1053  18640 0

c  -1+1 --> 0
c    ( b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0 ∧  p_1053) -> (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧ -b^{81, 14}_0)
c  in CNF:
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_2
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_1
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_0
c  in DIMACS:
-18635  18636 -18637 -1053 -18638 0
-18635  18636 -18637 -1053 -18639 0
-18635  18636 -18637 -1053 -18640 0

c  0+1 --> 1
c    (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧  p_1053) -> (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0)
c  in CNF:
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_2
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_1
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨  b^{81, 14}_0
c  in DIMACS:
 18635  18636  18637 -1053 -18638 0
 18635  18636  18637 -1053 -18639 0
 18635  18636  18637 -1053  18640 0

c  1+1 --> 2
c    (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0 ∧  p_1053) -> (-b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0)
c  in CNF:
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_2
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨  b^{81, 14}_1
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ -p_1053 ∨ -b^{81, 14}_0
c  in DIMACS:
 18635  18636 -18637 -1053 -18638 0
 18635  18636 -18637 -1053  18639 0
 18635  18636 -18637 -1053 -18640 0

c  2+1 --> break 
c    (-b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 18635 -18636  18637 -1053 1162 0


c  2-1 --> 1
c    (-b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧ -p_1053) -> (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0)
c  in CNF:
c     b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_2
c     b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_1
c     b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨  b^{81, 14}_0
c  in DIMACS:
 18635 -18636  18637  1053 -18638 0
 18635 -18636  18637  1053 -18639 0
 18635 -18636  18637  1053  18640 0

c  1-1 --> 0
c    (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0 ∧ -p_1053) -> (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧ -b^{81, 14}_0)
c  in CNF:
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_2
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_1
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_0
c  in DIMACS:
 18635  18636 -18637  1053 -18638 0
 18635  18636 -18637  1053 -18639 0
 18635  18636 -18637  1053 -18640 0

c  0-1 --> -1
c    (-b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧ -p_1053) -> ( b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0)
c  in CNF:
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨  b^{81, 14}_2
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_1
c     b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨  b^{81, 14}_0
c  in DIMACS:
 18635  18636  18637  1053  18638 0
 18635  18636  18637  1053 -18639 0
 18635  18636  18637  1053  18640 0

c  -1-1 --> -2
c    ( b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧  b^{81, 13}_0 ∧ -p_1053) -> ( b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0)
c  in CNF:
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨  b^{81, 14}_2
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨  b^{81, 14}_1
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨  p_1053 ∨ -b^{81, 14}_0
c  in DIMACS:
-18635  18636 -18637  1053  18638 0
-18635  18636 -18637  1053  18639 0
-18635  18636 -18637  1053 -18640 0

c  -2-1 --> break 
c    ( b^{81, 13}_2 ∧  b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨  b^{81, 13}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-18635 -18636  18637  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 13}_2 ∧ -b^{81, 13}_1 ∧ -b^{81, 13}_0 ∧ true) 
c  in CNF:
c    -b^{81, 13}_2 ∨  b^{81, 13}_1 ∨  b^{81, 13}_0 ∨ false 
c  in DIMACS:
-18635  18636  18637  0

c  3 does not represent an automaton state.
c    -(-b^{81, 13}_2 ∧  b^{81, 13}_1 ∧  b^{81, 13}_0 ∧ true) 
c  in CNF:
c     b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ false 
c  in DIMACS:
 18635 -18636 -18637  0
c  -3 does not represent an automaton state.
c    -( b^{81, 13}_2 ∧  b^{81, 13}_1 ∧  b^{81, 13}_0 ∧ true) 
c  in CNF:
c    -b^{81, 13}_2 ∨ -b^{81, 13}_1 ∨ -b^{81, 13}_0 ∨ false 
c  in DIMACS:
-18635 -18636 -18637  0

c i = 14
c  -2+1 --> -1
c    ( b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧  p_1134) -> ( b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧  b^{81, 15}_0)
c  in CNF:
c    -b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨  b^{81, 15}_2
c    -b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_1
c    -b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨  b^{81, 15}_0
c  in DIMACS:
-18638 -18639  18640 -1134  18641 0
-18638 -18639  18640 -1134 -18642 0
-18638 -18639  18640 -1134  18643 0

c  -1+1 --> 0
c    ( b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0 ∧  p_1134) -> (-b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧ -b^{81, 15}_0)
c  in CNF:
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_2
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_1
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_0
c  in DIMACS:
-18638  18639 -18640 -1134 -18641 0
-18638  18639 -18640 -1134 -18642 0
-18638  18639 -18640 -1134 -18643 0

c  0+1 --> 1
c    (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧  p_1134) -> (-b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧  b^{81, 15}_0)
c  in CNF:
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_2
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_1
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨  b^{81, 15}_0
c  in DIMACS:
 18638  18639  18640 -1134 -18641 0
 18638  18639  18640 -1134 -18642 0
 18638  18639  18640 -1134  18643 0

c  1+1 --> 2
c    (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0 ∧  p_1134) -> (-b^{81, 15}_2 ∧  b^{81, 15}_1 ∧ -b^{81, 15}_0)
c  in CNF:
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_2
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨  b^{81, 15}_1
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ -p_1134 ∨ -b^{81, 15}_0
c  in DIMACS:
 18638  18639 -18640 -1134 -18641 0
 18638  18639 -18640 -1134  18642 0
 18638  18639 -18640 -1134 -18643 0

c  2+1 --> break 
c    (-b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 18638 -18639  18640 -1134 1162 0


c  2-1 --> 1
c    (-b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧ -p_1134) -> (-b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧  b^{81, 15}_0)
c  in CNF:
c     b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_2
c     b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_1
c     b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨  b^{81, 15}_0
c  in DIMACS:
 18638 -18639  18640  1134 -18641 0
 18638 -18639  18640  1134 -18642 0
 18638 -18639  18640  1134  18643 0

c  1-1 --> 0
c    (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0 ∧ -p_1134) -> (-b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧ -b^{81, 15}_0)
c  in CNF:
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_2
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_1
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_0
c  in DIMACS:
 18638  18639 -18640  1134 -18641 0
 18638  18639 -18640  1134 -18642 0
 18638  18639 -18640  1134 -18643 0

c  0-1 --> -1
c    (-b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧ -p_1134) -> ( b^{81, 15}_2 ∧ -b^{81, 15}_1 ∧  b^{81, 15}_0)
c  in CNF:
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨  b^{81, 15}_2
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_1
c     b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨  b^{81, 15}_0
c  in DIMACS:
 18638  18639  18640  1134  18641 0
 18638  18639  18640  1134 -18642 0
 18638  18639  18640  1134  18643 0

c  -1-1 --> -2
c    ( b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧  b^{81, 14}_0 ∧ -p_1134) -> ( b^{81, 15}_2 ∧  b^{81, 15}_1 ∧ -b^{81, 15}_0)
c  in CNF:
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨  b^{81, 15}_2
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨  b^{81, 15}_1
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨  p_1134 ∨ -b^{81, 15}_0
c  in DIMACS:
-18638  18639 -18640  1134  18641 0
-18638  18639 -18640  1134  18642 0
-18638  18639 -18640  1134 -18643 0

c  -2-1 --> break 
c    ( b^{81, 14}_2 ∧  b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨  b^{81, 14}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-18638 -18639  18640  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{81, 14}_2 ∧ -b^{81, 14}_1 ∧ -b^{81, 14}_0 ∧ true) 
c  in CNF:
c    -b^{81, 14}_2 ∨  b^{81, 14}_1 ∨  b^{81, 14}_0 ∨ false 
c  in DIMACS:
-18638  18639  18640  0

c  3 does not represent an automaton state.
c    -(-b^{81, 14}_2 ∧  b^{81, 14}_1 ∧  b^{81, 14}_0 ∧ true) 
c  in CNF:
c     b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ false 
c  in DIMACS:
 18638 -18639 -18640  0
c  -3 does not represent an automaton state.
c    -( b^{81, 14}_2 ∧  b^{81, 14}_1 ∧  b^{81, 14}_0 ∧ true) 
c  in CNF:
c    -b^{81, 14}_2 ∨ -b^{81, 14}_1 ∨ -b^{81, 14}_0 ∨ false 
c  in DIMACS:
-18638 -18639 -18640  0

c INIT for k = 82
c    -b^{82, 1}_2
c    -b^{82, 1}_1
c    -b^{82, 1}_0
c  in DIMACS:
-18644 0
-18645 0
-18646 0

c Transitions for k = 82
c i = 1
c  -2+1 --> -1
c    ( b^{82, 1}_2 ∧  b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧  p_82) -> ( b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0)
c  in CNF:
c    -b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨  b^{82, 2}_2
c    -b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_1
c    -b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨  b^{82, 2}_0
c  in DIMACS:
-18644 -18645  18646 -82  18647 0
-18644 -18645  18646 -82 -18648 0
-18644 -18645  18646 -82  18649 0

c  -1+1 --> 0
c    ( b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧  b^{82, 1}_0 ∧  p_82) -> (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧ -b^{82, 2}_0)
c  in CNF:
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_2
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_1
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_0
c  in DIMACS:
-18644  18645 -18646 -82 -18647 0
-18644  18645 -18646 -82 -18648 0
-18644  18645 -18646 -82 -18649 0

c  0+1 --> 1
c    (-b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧  p_82) -> (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0)
c  in CNF:
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_2
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_1
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨  b^{82, 2}_0
c  in DIMACS:
 18644  18645  18646 -82 -18647 0
 18644  18645  18646 -82 -18648 0
 18644  18645  18646 -82  18649 0

c  1+1 --> 2
c    (-b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧  b^{82, 1}_0 ∧  p_82) -> (-b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0)
c  in CNF:
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_2
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨  b^{82, 2}_1
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ -p_82 ∨ -b^{82, 2}_0
c  in DIMACS:
 18644  18645 -18646 -82 -18647 0
 18644  18645 -18646 -82  18648 0
 18644  18645 -18646 -82 -18649 0

c  2+1 --> break 
c    (-b^{82, 1}_2 ∧  b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧  p_82) -> break
c  in CNF:
c     b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ -p_82 ∨ break
c  in DIMACS:
 18644 -18645  18646 -82 1162 0


c  2-1 --> 1
c    (-b^{82, 1}_2 ∧  b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧ -p_82) -> (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0)
c  in CNF:
c     b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_2
c     b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_1
c     b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨  b^{82, 2}_0
c  in DIMACS:
 18644 -18645  18646  82 -18647 0
 18644 -18645  18646  82 -18648 0
 18644 -18645  18646  82  18649 0

c  1-1 --> 0
c    (-b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧  b^{82, 1}_0 ∧ -p_82) -> (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧ -b^{82, 2}_0)
c  in CNF:
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_2
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_1
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_0
c  in DIMACS:
 18644  18645 -18646  82 -18647 0
 18644  18645 -18646  82 -18648 0
 18644  18645 -18646  82 -18649 0

c  0-1 --> -1
c    (-b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧ -p_82) -> ( b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0)
c  in CNF:
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨  b^{82, 2}_2
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_1
c     b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨  b^{82, 2}_0
c  in DIMACS:
 18644  18645  18646  82  18647 0
 18644  18645  18646  82 -18648 0
 18644  18645  18646  82  18649 0

c  -1-1 --> -2
c    ( b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧  b^{82, 1}_0 ∧ -p_82) -> ( b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0)
c  in CNF:
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨  b^{82, 2}_2
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨  b^{82, 2}_1
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨  p_82 ∨ -b^{82, 2}_0
c  in DIMACS:
-18644  18645 -18646  82  18647 0
-18644  18645 -18646  82  18648 0
-18644  18645 -18646  82 -18649 0

c  -2-1 --> break 
c    ( b^{82, 1}_2 ∧  b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧ -p_82) -> break
c  in CNF:
c    -b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨  b^{82, 1}_0 ∨  p_82 ∨ break
c  in DIMACS:
-18644 -18645  18646  82 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 1}_2 ∧ -b^{82, 1}_1 ∧ -b^{82, 1}_0 ∧ true) 
c  in CNF:
c    -b^{82, 1}_2 ∨  b^{82, 1}_1 ∨  b^{82, 1}_0 ∨ false 
c  in DIMACS:
-18644  18645  18646  0

c  3 does not represent an automaton state.
c    -(-b^{82, 1}_2 ∧  b^{82, 1}_1 ∧  b^{82, 1}_0 ∧ true) 
c  in CNF:
c     b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ false 
c  in DIMACS:
 18644 -18645 -18646  0
c  -3 does not represent an automaton state.
c    -( b^{82, 1}_2 ∧  b^{82, 1}_1 ∧  b^{82, 1}_0 ∧ true) 
c  in CNF:
c    -b^{82, 1}_2 ∨ -b^{82, 1}_1 ∨ -b^{82, 1}_0 ∨ false 
c  in DIMACS:
-18644 -18645 -18646  0

c i = 2
c  -2+1 --> -1
c    ( b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧  p_164) -> ( b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0)
c  in CNF:
c    -b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨  b^{82, 3}_2
c    -b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_1
c    -b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨  b^{82, 3}_0
c  in DIMACS:
-18647 -18648  18649 -164  18650 0
-18647 -18648  18649 -164 -18651 0
-18647 -18648  18649 -164  18652 0

c  -1+1 --> 0
c    ( b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0 ∧  p_164) -> (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧ -b^{82, 3}_0)
c  in CNF:
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_2
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_1
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_0
c  in DIMACS:
-18647  18648 -18649 -164 -18650 0
-18647  18648 -18649 -164 -18651 0
-18647  18648 -18649 -164 -18652 0

c  0+1 --> 1
c    (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧  p_164) -> (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0)
c  in CNF:
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_2
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_1
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨  b^{82, 3}_0
c  in DIMACS:
 18647  18648  18649 -164 -18650 0
 18647  18648  18649 -164 -18651 0
 18647  18648  18649 -164  18652 0

c  1+1 --> 2
c    (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0 ∧  p_164) -> (-b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0)
c  in CNF:
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_2
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨  b^{82, 3}_1
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ -p_164 ∨ -b^{82, 3}_0
c  in DIMACS:
 18647  18648 -18649 -164 -18650 0
 18647  18648 -18649 -164  18651 0
 18647  18648 -18649 -164 -18652 0

c  2+1 --> break 
c    (-b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧  p_164) -> break
c  in CNF:
c     b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 18647 -18648  18649 -164 1162 0


c  2-1 --> 1
c    (-b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧ -p_164) -> (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0)
c  in CNF:
c     b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_2
c     b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_1
c     b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨  b^{82, 3}_0
c  in DIMACS:
 18647 -18648  18649  164 -18650 0
 18647 -18648  18649  164 -18651 0
 18647 -18648  18649  164  18652 0

c  1-1 --> 0
c    (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0 ∧ -p_164) -> (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧ -b^{82, 3}_0)
c  in CNF:
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_2
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_1
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_0
c  in DIMACS:
 18647  18648 -18649  164 -18650 0
 18647  18648 -18649  164 -18651 0
 18647  18648 -18649  164 -18652 0

c  0-1 --> -1
c    (-b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧ -p_164) -> ( b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0)
c  in CNF:
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨  b^{82, 3}_2
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_1
c     b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨  b^{82, 3}_0
c  in DIMACS:
 18647  18648  18649  164  18650 0
 18647  18648  18649  164 -18651 0
 18647  18648  18649  164  18652 0

c  -1-1 --> -2
c    ( b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧  b^{82, 2}_0 ∧ -p_164) -> ( b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0)
c  in CNF:
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨  b^{82, 3}_2
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨  b^{82, 3}_1
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨  p_164 ∨ -b^{82, 3}_0
c  in DIMACS:
-18647  18648 -18649  164  18650 0
-18647  18648 -18649  164  18651 0
-18647  18648 -18649  164 -18652 0

c  -2-1 --> break 
c    ( b^{82, 2}_2 ∧  b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨  b^{82, 2}_0 ∨  p_164 ∨ break
c  in DIMACS:
-18647 -18648  18649  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 2}_2 ∧ -b^{82, 2}_1 ∧ -b^{82, 2}_0 ∧ true) 
c  in CNF:
c    -b^{82, 2}_2 ∨  b^{82, 2}_1 ∨  b^{82, 2}_0 ∨ false 
c  in DIMACS:
-18647  18648  18649  0

c  3 does not represent an automaton state.
c    -(-b^{82, 2}_2 ∧  b^{82, 2}_1 ∧  b^{82, 2}_0 ∧ true) 
c  in CNF:
c     b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ false 
c  in DIMACS:
 18647 -18648 -18649  0
c  -3 does not represent an automaton state.
c    -( b^{82, 2}_2 ∧  b^{82, 2}_1 ∧  b^{82, 2}_0 ∧ true) 
c  in CNF:
c    -b^{82, 2}_2 ∨ -b^{82, 2}_1 ∨ -b^{82, 2}_0 ∨ false 
c  in DIMACS:
-18647 -18648 -18649  0

c i = 3
c  -2+1 --> -1
c    ( b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧  p_246) -> ( b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0)
c  in CNF:
c    -b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨  b^{82, 4}_2
c    -b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_1
c    -b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨  b^{82, 4}_0
c  in DIMACS:
-18650 -18651  18652 -246  18653 0
-18650 -18651  18652 -246 -18654 0
-18650 -18651  18652 -246  18655 0

c  -1+1 --> 0
c    ( b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0 ∧  p_246) -> (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧ -b^{82, 4}_0)
c  in CNF:
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_2
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_1
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_0
c  in DIMACS:
-18650  18651 -18652 -246 -18653 0
-18650  18651 -18652 -246 -18654 0
-18650  18651 -18652 -246 -18655 0

c  0+1 --> 1
c    (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧  p_246) -> (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0)
c  in CNF:
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_2
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_1
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨  b^{82, 4}_0
c  in DIMACS:
 18650  18651  18652 -246 -18653 0
 18650  18651  18652 -246 -18654 0
 18650  18651  18652 -246  18655 0

c  1+1 --> 2
c    (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0 ∧  p_246) -> (-b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0)
c  in CNF:
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_2
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨  b^{82, 4}_1
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ -p_246 ∨ -b^{82, 4}_0
c  in DIMACS:
 18650  18651 -18652 -246 -18653 0
 18650  18651 -18652 -246  18654 0
 18650  18651 -18652 -246 -18655 0

c  2+1 --> break 
c    (-b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧  p_246) -> break
c  in CNF:
c     b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 18650 -18651  18652 -246 1162 0


c  2-1 --> 1
c    (-b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧ -p_246) -> (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0)
c  in CNF:
c     b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_2
c     b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_1
c     b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨  b^{82, 4}_0
c  in DIMACS:
 18650 -18651  18652  246 -18653 0
 18650 -18651  18652  246 -18654 0
 18650 -18651  18652  246  18655 0

c  1-1 --> 0
c    (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0 ∧ -p_246) -> (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧ -b^{82, 4}_0)
c  in CNF:
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_2
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_1
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_0
c  in DIMACS:
 18650  18651 -18652  246 -18653 0
 18650  18651 -18652  246 -18654 0
 18650  18651 -18652  246 -18655 0

c  0-1 --> -1
c    (-b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧ -p_246) -> ( b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0)
c  in CNF:
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨  b^{82, 4}_2
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_1
c     b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨  b^{82, 4}_0
c  in DIMACS:
 18650  18651  18652  246  18653 0
 18650  18651  18652  246 -18654 0
 18650  18651  18652  246  18655 0

c  -1-1 --> -2
c    ( b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧  b^{82, 3}_0 ∧ -p_246) -> ( b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0)
c  in CNF:
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨  b^{82, 4}_2
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨  b^{82, 4}_1
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨  p_246 ∨ -b^{82, 4}_0
c  in DIMACS:
-18650  18651 -18652  246  18653 0
-18650  18651 -18652  246  18654 0
-18650  18651 -18652  246 -18655 0

c  -2-1 --> break 
c    ( b^{82, 3}_2 ∧  b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨  b^{82, 3}_0 ∨  p_246 ∨ break
c  in DIMACS:
-18650 -18651  18652  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 3}_2 ∧ -b^{82, 3}_1 ∧ -b^{82, 3}_0 ∧ true) 
c  in CNF:
c    -b^{82, 3}_2 ∨  b^{82, 3}_1 ∨  b^{82, 3}_0 ∨ false 
c  in DIMACS:
-18650  18651  18652  0

c  3 does not represent an automaton state.
c    -(-b^{82, 3}_2 ∧  b^{82, 3}_1 ∧  b^{82, 3}_0 ∧ true) 
c  in CNF:
c     b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ false 
c  in DIMACS:
 18650 -18651 -18652  0
c  -3 does not represent an automaton state.
c    -( b^{82, 3}_2 ∧  b^{82, 3}_1 ∧  b^{82, 3}_0 ∧ true) 
c  in CNF:
c    -b^{82, 3}_2 ∨ -b^{82, 3}_1 ∨ -b^{82, 3}_0 ∨ false 
c  in DIMACS:
-18650 -18651 -18652  0

c i = 4
c  -2+1 --> -1
c    ( b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧  p_328) -> ( b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0)
c  in CNF:
c    -b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨  b^{82, 5}_2
c    -b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_1
c    -b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨  b^{82, 5}_0
c  in DIMACS:
-18653 -18654  18655 -328  18656 0
-18653 -18654  18655 -328 -18657 0
-18653 -18654  18655 -328  18658 0

c  -1+1 --> 0
c    ( b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0 ∧  p_328) -> (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧ -b^{82, 5}_0)
c  in CNF:
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_2
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_1
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_0
c  in DIMACS:
-18653  18654 -18655 -328 -18656 0
-18653  18654 -18655 -328 -18657 0
-18653  18654 -18655 -328 -18658 0

c  0+1 --> 1
c    (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧  p_328) -> (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0)
c  in CNF:
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_2
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_1
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨  b^{82, 5}_0
c  in DIMACS:
 18653  18654  18655 -328 -18656 0
 18653  18654  18655 -328 -18657 0
 18653  18654  18655 -328  18658 0

c  1+1 --> 2
c    (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0 ∧  p_328) -> (-b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0)
c  in CNF:
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_2
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨  b^{82, 5}_1
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ -p_328 ∨ -b^{82, 5}_0
c  in DIMACS:
 18653  18654 -18655 -328 -18656 0
 18653  18654 -18655 -328  18657 0
 18653  18654 -18655 -328 -18658 0

c  2+1 --> break 
c    (-b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧  p_328) -> break
c  in CNF:
c     b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 18653 -18654  18655 -328 1162 0


c  2-1 --> 1
c    (-b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧ -p_328) -> (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0)
c  in CNF:
c     b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_2
c     b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_1
c     b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨  b^{82, 5}_0
c  in DIMACS:
 18653 -18654  18655  328 -18656 0
 18653 -18654  18655  328 -18657 0
 18653 -18654  18655  328  18658 0

c  1-1 --> 0
c    (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0 ∧ -p_328) -> (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧ -b^{82, 5}_0)
c  in CNF:
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_2
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_1
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_0
c  in DIMACS:
 18653  18654 -18655  328 -18656 0
 18653  18654 -18655  328 -18657 0
 18653  18654 -18655  328 -18658 0

c  0-1 --> -1
c    (-b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧ -p_328) -> ( b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0)
c  in CNF:
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨  b^{82, 5}_2
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_1
c     b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨  b^{82, 5}_0
c  in DIMACS:
 18653  18654  18655  328  18656 0
 18653  18654  18655  328 -18657 0
 18653  18654  18655  328  18658 0

c  -1-1 --> -2
c    ( b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧  b^{82, 4}_0 ∧ -p_328) -> ( b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0)
c  in CNF:
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨  b^{82, 5}_2
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨  b^{82, 5}_1
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨  p_328 ∨ -b^{82, 5}_0
c  in DIMACS:
-18653  18654 -18655  328  18656 0
-18653  18654 -18655  328  18657 0
-18653  18654 -18655  328 -18658 0

c  -2-1 --> break 
c    ( b^{82, 4}_2 ∧  b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨  b^{82, 4}_0 ∨  p_328 ∨ break
c  in DIMACS:
-18653 -18654  18655  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 4}_2 ∧ -b^{82, 4}_1 ∧ -b^{82, 4}_0 ∧ true) 
c  in CNF:
c    -b^{82, 4}_2 ∨  b^{82, 4}_1 ∨  b^{82, 4}_0 ∨ false 
c  in DIMACS:
-18653  18654  18655  0

c  3 does not represent an automaton state.
c    -(-b^{82, 4}_2 ∧  b^{82, 4}_1 ∧  b^{82, 4}_0 ∧ true) 
c  in CNF:
c     b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ false 
c  in DIMACS:
 18653 -18654 -18655  0
c  -3 does not represent an automaton state.
c    -( b^{82, 4}_2 ∧  b^{82, 4}_1 ∧  b^{82, 4}_0 ∧ true) 
c  in CNF:
c    -b^{82, 4}_2 ∨ -b^{82, 4}_1 ∨ -b^{82, 4}_0 ∨ false 
c  in DIMACS:
-18653 -18654 -18655  0

c i = 5
c  -2+1 --> -1
c    ( b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧  p_410) -> ( b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0)
c  in CNF:
c    -b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨  b^{82, 6}_2
c    -b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_1
c    -b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨  b^{82, 6}_0
c  in DIMACS:
-18656 -18657  18658 -410  18659 0
-18656 -18657  18658 -410 -18660 0
-18656 -18657  18658 -410  18661 0

c  -1+1 --> 0
c    ( b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0 ∧  p_410) -> (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧ -b^{82, 6}_0)
c  in CNF:
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_2
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_1
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_0
c  in DIMACS:
-18656  18657 -18658 -410 -18659 0
-18656  18657 -18658 -410 -18660 0
-18656  18657 -18658 -410 -18661 0

c  0+1 --> 1
c    (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧  p_410) -> (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0)
c  in CNF:
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_2
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_1
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨  b^{82, 6}_0
c  in DIMACS:
 18656  18657  18658 -410 -18659 0
 18656  18657  18658 -410 -18660 0
 18656  18657  18658 -410  18661 0

c  1+1 --> 2
c    (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0 ∧  p_410) -> (-b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0)
c  in CNF:
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_2
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨  b^{82, 6}_1
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ -p_410 ∨ -b^{82, 6}_0
c  in DIMACS:
 18656  18657 -18658 -410 -18659 0
 18656  18657 -18658 -410  18660 0
 18656  18657 -18658 -410 -18661 0

c  2+1 --> break 
c    (-b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧  p_410) -> break
c  in CNF:
c     b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 18656 -18657  18658 -410 1162 0


c  2-1 --> 1
c    (-b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧ -p_410) -> (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0)
c  in CNF:
c     b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_2
c     b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_1
c     b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨  b^{82, 6}_0
c  in DIMACS:
 18656 -18657  18658  410 -18659 0
 18656 -18657  18658  410 -18660 0
 18656 -18657  18658  410  18661 0

c  1-1 --> 0
c    (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0 ∧ -p_410) -> (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧ -b^{82, 6}_0)
c  in CNF:
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_2
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_1
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_0
c  in DIMACS:
 18656  18657 -18658  410 -18659 0
 18656  18657 -18658  410 -18660 0
 18656  18657 -18658  410 -18661 0

c  0-1 --> -1
c    (-b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧ -p_410) -> ( b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0)
c  in CNF:
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨  b^{82, 6}_2
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_1
c     b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨  b^{82, 6}_0
c  in DIMACS:
 18656  18657  18658  410  18659 0
 18656  18657  18658  410 -18660 0
 18656  18657  18658  410  18661 0

c  -1-1 --> -2
c    ( b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧  b^{82, 5}_0 ∧ -p_410) -> ( b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0)
c  in CNF:
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨  b^{82, 6}_2
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨  b^{82, 6}_1
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨  p_410 ∨ -b^{82, 6}_0
c  in DIMACS:
-18656  18657 -18658  410  18659 0
-18656  18657 -18658  410  18660 0
-18656  18657 -18658  410 -18661 0

c  -2-1 --> break 
c    ( b^{82, 5}_2 ∧  b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨  b^{82, 5}_0 ∨  p_410 ∨ break
c  in DIMACS:
-18656 -18657  18658  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 5}_2 ∧ -b^{82, 5}_1 ∧ -b^{82, 5}_0 ∧ true) 
c  in CNF:
c    -b^{82, 5}_2 ∨  b^{82, 5}_1 ∨  b^{82, 5}_0 ∨ false 
c  in DIMACS:
-18656  18657  18658  0

c  3 does not represent an automaton state.
c    -(-b^{82, 5}_2 ∧  b^{82, 5}_1 ∧  b^{82, 5}_0 ∧ true) 
c  in CNF:
c     b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ false 
c  in DIMACS:
 18656 -18657 -18658  0
c  -3 does not represent an automaton state.
c    -( b^{82, 5}_2 ∧  b^{82, 5}_1 ∧  b^{82, 5}_0 ∧ true) 
c  in CNF:
c    -b^{82, 5}_2 ∨ -b^{82, 5}_1 ∨ -b^{82, 5}_0 ∨ false 
c  in DIMACS:
-18656 -18657 -18658  0

c i = 6
c  -2+1 --> -1
c    ( b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧  p_492) -> ( b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0)
c  in CNF:
c    -b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨  b^{82, 7}_2
c    -b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_1
c    -b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨  b^{82, 7}_0
c  in DIMACS:
-18659 -18660  18661 -492  18662 0
-18659 -18660  18661 -492 -18663 0
-18659 -18660  18661 -492  18664 0

c  -1+1 --> 0
c    ( b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0 ∧  p_492) -> (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧ -b^{82, 7}_0)
c  in CNF:
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_2
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_1
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_0
c  in DIMACS:
-18659  18660 -18661 -492 -18662 0
-18659  18660 -18661 -492 -18663 0
-18659  18660 -18661 -492 -18664 0

c  0+1 --> 1
c    (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧  p_492) -> (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0)
c  in CNF:
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_2
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_1
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨  b^{82, 7}_0
c  in DIMACS:
 18659  18660  18661 -492 -18662 0
 18659  18660  18661 -492 -18663 0
 18659  18660  18661 -492  18664 0

c  1+1 --> 2
c    (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0 ∧  p_492) -> (-b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0)
c  in CNF:
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_2
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨  b^{82, 7}_1
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ -p_492 ∨ -b^{82, 7}_0
c  in DIMACS:
 18659  18660 -18661 -492 -18662 0
 18659  18660 -18661 -492  18663 0
 18659  18660 -18661 -492 -18664 0

c  2+1 --> break 
c    (-b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧  p_492) -> break
c  in CNF:
c     b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 18659 -18660  18661 -492 1162 0


c  2-1 --> 1
c    (-b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧ -p_492) -> (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0)
c  in CNF:
c     b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_2
c     b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_1
c     b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨  b^{82, 7}_0
c  in DIMACS:
 18659 -18660  18661  492 -18662 0
 18659 -18660  18661  492 -18663 0
 18659 -18660  18661  492  18664 0

c  1-1 --> 0
c    (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0 ∧ -p_492) -> (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧ -b^{82, 7}_0)
c  in CNF:
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_2
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_1
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_0
c  in DIMACS:
 18659  18660 -18661  492 -18662 0
 18659  18660 -18661  492 -18663 0
 18659  18660 -18661  492 -18664 0

c  0-1 --> -1
c    (-b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧ -p_492) -> ( b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0)
c  in CNF:
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨  b^{82, 7}_2
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_1
c     b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨  b^{82, 7}_0
c  in DIMACS:
 18659  18660  18661  492  18662 0
 18659  18660  18661  492 -18663 0
 18659  18660  18661  492  18664 0

c  -1-1 --> -2
c    ( b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧  b^{82, 6}_0 ∧ -p_492) -> ( b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0)
c  in CNF:
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨  b^{82, 7}_2
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨  b^{82, 7}_1
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨  p_492 ∨ -b^{82, 7}_0
c  in DIMACS:
-18659  18660 -18661  492  18662 0
-18659  18660 -18661  492  18663 0
-18659  18660 -18661  492 -18664 0

c  -2-1 --> break 
c    ( b^{82, 6}_2 ∧  b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨  b^{82, 6}_0 ∨  p_492 ∨ break
c  in DIMACS:
-18659 -18660  18661  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 6}_2 ∧ -b^{82, 6}_1 ∧ -b^{82, 6}_0 ∧ true) 
c  in CNF:
c    -b^{82, 6}_2 ∨  b^{82, 6}_1 ∨  b^{82, 6}_0 ∨ false 
c  in DIMACS:
-18659  18660  18661  0

c  3 does not represent an automaton state.
c    -(-b^{82, 6}_2 ∧  b^{82, 6}_1 ∧  b^{82, 6}_0 ∧ true) 
c  in CNF:
c     b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ false 
c  in DIMACS:
 18659 -18660 -18661  0
c  -3 does not represent an automaton state.
c    -( b^{82, 6}_2 ∧  b^{82, 6}_1 ∧  b^{82, 6}_0 ∧ true) 
c  in CNF:
c    -b^{82, 6}_2 ∨ -b^{82, 6}_1 ∨ -b^{82, 6}_0 ∨ false 
c  in DIMACS:
-18659 -18660 -18661  0

c i = 7
c  -2+1 --> -1
c    ( b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧  p_574) -> ( b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0)
c  in CNF:
c    -b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨  b^{82, 8}_2
c    -b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_1
c    -b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨  b^{82, 8}_0
c  in DIMACS:
-18662 -18663  18664 -574  18665 0
-18662 -18663  18664 -574 -18666 0
-18662 -18663  18664 -574  18667 0

c  -1+1 --> 0
c    ( b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0 ∧  p_574) -> (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧ -b^{82, 8}_0)
c  in CNF:
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_2
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_1
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_0
c  in DIMACS:
-18662  18663 -18664 -574 -18665 0
-18662  18663 -18664 -574 -18666 0
-18662  18663 -18664 -574 -18667 0

c  0+1 --> 1
c    (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧  p_574) -> (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0)
c  in CNF:
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_2
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_1
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨  b^{82, 8}_0
c  in DIMACS:
 18662  18663  18664 -574 -18665 0
 18662  18663  18664 -574 -18666 0
 18662  18663  18664 -574  18667 0

c  1+1 --> 2
c    (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0 ∧  p_574) -> (-b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0)
c  in CNF:
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_2
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨  b^{82, 8}_1
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ -p_574 ∨ -b^{82, 8}_0
c  in DIMACS:
 18662  18663 -18664 -574 -18665 0
 18662  18663 -18664 -574  18666 0
 18662  18663 -18664 -574 -18667 0

c  2+1 --> break 
c    (-b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧  p_574) -> break
c  in CNF:
c     b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 18662 -18663  18664 -574 1162 0


c  2-1 --> 1
c    (-b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧ -p_574) -> (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0)
c  in CNF:
c     b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_2
c     b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_1
c     b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨  b^{82, 8}_0
c  in DIMACS:
 18662 -18663  18664  574 -18665 0
 18662 -18663  18664  574 -18666 0
 18662 -18663  18664  574  18667 0

c  1-1 --> 0
c    (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0 ∧ -p_574) -> (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧ -b^{82, 8}_0)
c  in CNF:
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_2
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_1
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_0
c  in DIMACS:
 18662  18663 -18664  574 -18665 0
 18662  18663 -18664  574 -18666 0
 18662  18663 -18664  574 -18667 0

c  0-1 --> -1
c    (-b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧ -p_574) -> ( b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0)
c  in CNF:
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨  b^{82, 8}_2
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_1
c     b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨  b^{82, 8}_0
c  in DIMACS:
 18662  18663  18664  574  18665 0
 18662  18663  18664  574 -18666 0
 18662  18663  18664  574  18667 0

c  -1-1 --> -2
c    ( b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧  b^{82, 7}_0 ∧ -p_574) -> ( b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0)
c  in CNF:
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨  b^{82, 8}_2
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨  b^{82, 8}_1
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨  p_574 ∨ -b^{82, 8}_0
c  in DIMACS:
-18662  18663 -18664  574  18665 0
-18662  18663 -18664  574  18666 0
-18662  18663 -18664  574 -18667 0

c  -2-1 --> break 
c    ( b^{82, 7}_2 ∧  b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨  b^{82, 7}_0 ∨  p_574 ∨ break
c  in DIMACS:
-18662 -18663  18664  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 7}_2 ∧ -b^{82, 7}_1 ∧ -b^{82, 7}_0 ∧ true) 
c  in CNF:
c    -b^{82, 7}_2 ∨  b^{82, 7}_1 ∨  b^{82, 7}_0 ∨ false 
c  in DIMACS:
-18662  18663  18664  0

c  3 does not represent an automaton state.
c    -(-b^{82, 7}_2 ∧  b^{82, 7}_1 ∧  b^{82, 7}_0 ∧ true) 
c  in CNF:
c     b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ false 
c  in DIMACS:
 18662 -18663 -18664  0
c  -3 does not represent an automaton state.
c    -( b^{82, 7}_2 ∧  b^{82, 7}_1 ∧  b^{82, 7}_0 ∧ true) 
c  in CNF:
c    -b^{82, 7}_2 ∨ -b^{82, 7}_1 ∨ -b^{82, 7}_0 ∨ false 
c  in DIMACS:
-18662 -18663 -18664  0

c i = 8
c  -2+1 --> -1
c    ( b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧  p_656) -> ( b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0)
c  in CNF:
c    -b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨  b^{82, 9}_2
c    -b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_1
c    -b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨  b^{82, 9}_0
c  in DIMACS:
-18665 -18666  18667 -656  18668 0
-18665 -18666  18667 -656 -18669 0
-18665 -18666  18667 -656  18670 0

c  -1+1 --> 0
c    ( b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0 ∧  p_656) -> (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧ -b^{82, 9}_0)
c  in CNF:
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_2
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_1
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_0
c  in DIMACS:
-18665  18666 -18667 -656 -18668 0
-18665  18666 -18667 -656 -18669 0
-18665  18666 -18667 -656 -18670 0

c  0+1 --> 1
c    (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧  p_656) -> (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0)
c  in CNF:
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_2
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_1
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨  b^{82, 9}_0
c  in DIMACS:
 18665  18666  18667 -656 -18668 0
 18665  18666  18667 -656 -18669 0
 18665  18666  18667 -656  18670 0

c  1+1 --> 2
c    (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0 ∧  p_656) -> (-b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0)
c  in CNF:
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_2
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨  b^{82, 9}_1
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ -p_656 ∨ -b^{82, 9}_0
c  in DIMACS:
 18665  18666 -18667 -656 -18668 0
 18665  18666 -18667 -656  18669 0
 18665  18666 -18667 -656 -18670 0

c  2+1 --> break 
c    (-b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧  p_656) -> break
c  in CNF:
c     b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 18665 -18666  18667 -656 1162 0


c  2-1 --> 1
c    (-b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧ -p_656) -> (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0)
c  in CNF:
c     b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_2
c     b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_1
c     b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨  b^{82, 9}_0
c  in DIMACS:
 18665 -18666  18667  656 -18668 0
 18665 -18666  18667  656 -18669 0
 18665 -18666  18667  656  18670 0

c  1-1 --> 0
c    (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0 ∧ -p_656) -> (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧ -b^{82, 9}_0)
c  in CNF:
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_2
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_1
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_0
c  in DIMACS:
 18665  18666 -18667  656 -18668 0
 18665  18666 -18667  656 -18669 0
 18665  18666 -18667  656 -18670 0

c  0-1 --> -1
c    (-b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧ -p_656) -> ( b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0)
c  in CNF:
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨  b^{82, 9}_2
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_1
c     b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨  b^{82, 9}_0
c  in DIMACS:
 18665  18666  18667  656  18668 0
 18665  18666  18667  656 -18669 0
 18665  18666  18667  656  18670 0

c  -1-1 --> -2
c    ( b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧  b^{82, 8}_0 ∧ -p_656) -> ( b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0)
c  in CNF:
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨  b^{82, 9}_2
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨  b^{82, 9}_1
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨  p_656 ∨ -b^{82, 9}_0
c  in DIMACS:
-18665  18666 -18667  656  18668 0
-18665  18666 -18667  656  18669 0
-18665  18666 -18667  656 -18670 0

c  -2-1 --> break 
c    ( b^{82, 8}_2 ∧  b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨  b^{82, 8}_0 ∨  p_656 ∨ break
c  in DIMACS:
-18665 -18666  18667  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 8}_2 ∧ -b^{82, 8}_1 ∧ -b^{82, 8}_0 ∧ true) 
c  in CNF:
c    -b^{82, 8}_2 ∨  b^{82, 8}_1 ∨  b^{82, 8}_0 ∨ false 
c  in DIMACS:
-18665  18666  18667  0

c  3 does not represent an automaton state.
c    -(-b^{82, 8}_2 ∧  b^{82, 8}_1 ∧  b^{82, 8}_0 ∧ true) 
c  in CNF:
c     b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ false 
c  in DIMACS:
 18665 -18666 -18667  0
c  -3 does not represent an automaton state.
c    -( b^{82, 8}_2 ∧  b^{82, 8}_1 ∧  b^{82, 8}_0 ∧ true) 
c  in CNF:
c    -b^{82, 8}_2 ∨ -b^{82, 8}_1 ∨ -b^{82, 8}_0 ∨ false 
c  in DIMACS:
-18665 -18666 -18667  0

c i = 9
c  -2+1 --> -1
c    ( b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧  p_738) -> ( b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0)
c  in CNF:
c    -b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨  b^{82, 10}_2
c    -b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_1
c    -b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨  b^{82, 10}_0
c  in DIMACS:
-18668 -18669  18670 -738  18671 0
-18668 -18669  18670 -738 -18672 0
-18668 -18669  18670 -738  18673 0

c  -1+1 --> 0
c    ( b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0 ∧  p_738) -> (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧ -b^{82, 10}_0)
c  in CNF:
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_2
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_1
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_0
c  in DIMACS:
-18668  18669 -18670 -738 -18671 0
-18668  18669 -18670 -738 -18672 0
-18668  18669 -18670 -738 -18673 0

c  0+1 --> 1
c    (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧  p_738) -> (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0)
c  in CNF:
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_2
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_1
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨  b^{82, 10}_0
c  in DIMACS:
 18668  18669  18670 -738 -18671 0
 18668  18669  18670 -738 -18672 0
 18668  18669  18670 -738  18673 0

c  1+1 --> 2
c    (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0 ∧  p_738) -> (-b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0)
c  in CNF:
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_2
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨  b^{82, 10}_1
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ -p_738 ∨ -b^{82, 10}_0
c  in DIMACS:
 18668  18669 -18670 -738 -18671 0
 18668  18669 -18670 -738  18672 0
 18668  18669 -18670 -738 -18673 0

c  2+1 --> break 
c    (-b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧  p_738) -> break
c  in CNF:
c     b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 18668 -18669  18670 -738 1162 0


c  2-1 --> 1
c    (-b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧ -p_738) -> (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0)
c  in CNF:
c     b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_2
c     b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_1
c     b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨  b^{82, 10}_0
c  in DIMACS:
 18668 -18669  18670  738 -18671 0
 18668 -18669  18670  738 -18672 0
 18668 -18669  18670  738  18673 0

c  1-1 --> 0
c    (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0 ∧ -p_738) -> (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧ -b^{82, 10}_0)
c  in CNF:
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_2
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_1
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_0
c  in DIMACS:
 18668  18669 -18670  738 -18671 0
 18668  18669 -18670  738 -18672 0
 18668  18669 -18670  738 -18673 0

c  0-1 --> -1
c    (-b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧ -p_738) -> ( b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0)
c  in CNF:
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨  b^{82, 10}_2
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_1
c     b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨  b^{82, 10}_0
c  in DIMACS:
 18668  18669  18670  738  18671 0
 18668  18669  18670  738 -18672 0
 18668  18669  18670  738  18673 0

c  -1-1 --> -2
c    ( b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧  b^{82, 9}_0 ∧ -p_738) -> ( b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0)
c  in CNF:
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨  b^{82, 10}_2
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨  b^{82, 10}_1
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨  p_738 ∨ -b^{82, 10}_0
c  in DIMACS:
-18668  18669 -18670  738  18671 0
-18668  18669 -18670  738  18672 0
-18668  18669 -18670  738 -18673 0

c  -2-1 --> break 
c    ( b^{82, 9}_2 ∧  b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨  b^{82, 9}_0 ∨  p_738 ∨ break
c  in DIMACS:
-18668 -18669  18670  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 9}_2 ∧ -b^{82, 9}_1 ∧ -b^{82, 9}_0 ∧ true) 
c  in CNF:
c    -b^{82, 9}_2 ∨  b^{82, 9}_1 ∨  b^{82, 9}_0 ∨ false 
c  in DIMACS:
-18668  18669  18670  0

c  3 does not represent an automaton state.
c    -(-b^{82, 9}_2 ∧  b^{82, 9}_1 ∧  b^{82, 9}_0 ∧ true) 
c  in CNF:
c     b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ false 
c  in DIMACS:
 18668 -18669 -18670  0
c  -3 does not represent an automaton state.
c    -( b^{82, 9}_2 ∧  b^{82, 9}_1 ∧  b^{82, 9}_0 ∧ true) 
c  in CNF:
c    -b^{82, 9}_2 ∨ -b^{82, 9}_1 ∨ -b^{82, 9}_0 ∨ false 
c  in DIMACS:
-18668 -18669 -18670  0

c i = 10
c  -2+1 --> -1
c    ( b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧  p_820) -> ( b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0)
c  in CNF:
c    -b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨  b^{82, 11}_2
c    -b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_1
c    -b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨  b^{82, 11}_0
c  in DIMACS:
-18671 -18672  18673 -820  18674 0
-18671 -18672  18673 -820 -18675 0
-18671 -18672  18673 -820  18676 0

c  -1+1 --> 0
c    ( b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0 ∧  p_820) -> (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧ -b^{82, 11}_0)
c  in CNF:
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_2
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_1
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_0
c  in DIMACS:
-18671  18672 -18673 -820 -18674 0
-18671  18672 -18673 -820 -18675 0
-18671  18672 -18673 -820 -18676 0

c  0+1 --> 1
c    (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧  p_820) -> (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0)
c  in CNF:
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_2
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_1
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨  b^{82, 11}_0
c  in DIMACS:
 18671  18672  18673 -820 -18674 0
 18671  18672  18673 -820 -18675 0
 18671  18672  18673 -820  18676 0

c  1+1 --> 2
c    (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0 ∧  p_820) -> (-b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0)
c  in CNF:
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_2
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨  b^{82, 11}_1
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ -p_820 ∨ -b^{82, 11}_0
c  in DIMACS:
 18671  18672 -18673 -820 -18674 0
 18671  18672 -18673 -820  18675 0
 18671  18672 -18673 -820 -18676 0

c  2+1 --> break 
c    (-b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧  p_820) -> break
c  in CNF:
c     b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 18671 -18672  18673 -820 1162 0


c  2-1 --> 1
c    (-b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧ -p_820) -> (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0)
c  in CNF:
c     b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_2
c     b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_1
c     b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨  b^{82, 11}_0
c  in DIMACS:
 18671 -18672  18673  820 -18674 0
 18671 -18672  18673  820 -18675 0
 18671 -18672  18673  820  18676 0

c  1-1 --> 0
c    (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0 ∧ -p_820) -> (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧ -b^{82, 11}_0)
c  in CNF:
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_2
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_1
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_0
c  in DIMACS:
 18671  18672 -18673  820 -18674 0
 18671  18672 -18673  820 -18675 0
 18671  18672 -18673  820 -18676 0

c  0-1 --> -1
c    (-b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧ -p_820) -> ( b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0)
c  in CNF:
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨  b^{82, 11}_2
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_1
c     b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨  b^{82, 11}_0
c  in DIMACS:
 18671  18672  18673  820  18674 0
 18671  18672  18673  820 -18675 0
 18671  18672  18673  820  18676 0

c  -1-1 --> -2
c    ( b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧  b^{82, 10}_0 ∧ -p_820) -> ( b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0)
c  in CNF:
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨  b^{82, 11}_2
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨  b^{82, 11}_1
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨  p_820 ∨ -b^{82, 11}_0
c  in DIMACS:
-18671  18672 -18673  820  18674 0
-18671  18672 -18673  820  18675 0
-18671  18672 -18673  820 -18676 0

c  -2-1 --> break 
c    ( b^{82, 10}_2 ∧  b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨  b^{82, 10}_0 ∨  p_820 ∨ break
c  in DIMACS:
-18671 -18672  18673  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 10}_2 ∧ -b^{82, 10}_1 ∧ -b^{82, 10}_0 ∧ true) 
c  in CNF:
c    -b^{82, 10}_2 ∨  b^{82, 10}_1 ∨  b^{82, 10}_0 ∨ false 
c  in DIMACS:
-18671  18672  18673  0

c  3 does not represent an automaton state.
c    -(-b^{82, 10}_2 ∧  b^{82, 10}_1 ∧  b^{82, 10}_0 ∧ true) 
c  in CNF:
c     b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ false 
c  in DIMACS:
 18671 -18672 -18673  0
c  -3 does not represent an automaton state.
c    -( b^{82, 10}_2 ∧  b^{82, 10}_1 ∧  b^{82, 10}_0 ∧ true) 
c  in CNF:
c    -b^{82, 10}_2 ∨ -b^{82, 10}_1 ∨ -b^{82, 10}_0 ∨ false 
c  in DIMACS:
-18671 -18672 -18673  0

c i = 11
c  -2+1 --> -1
c    ( b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧  p_902) -> ( b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0)
c  in CNF:
c    -b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨  b^{82, 12}_2
c    -b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_1
c    -b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨  b^{82, 12}_0
c  in DIMACS:
-18674 -18675  18676 -902  18677 0
-18674 -18675  18676 -902 -18678 0
-18674 -18675  18676 -902  18679 0

c  -1+1 --> 0
c    ( b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0 ∧  p_902) -> (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧ -b^{82, 12}_0)
c  in CNF:
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_2
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_1
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_0
c  in DIMACS:
-18674  18675 -18676 -902 -18677 0
-18674  18675 -18676 -902 -18678 0
-18674  18675 -18676 -902 -18679 0

c  0+1 --> 1
c    (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧  p_902) -> (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0)
c  in CNF:
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_2
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_1
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨  b^{82, 12}_0
c  in DIMACS:
 18674  18675  18676 -902 -18677 0
 18674  18675  18676 -902 -18678 0
 18674  18675  18676 -902  18679 0

c  1+1 --> 2
c    (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0 ∧  p_902) -> (-b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0)
c  in CNF:
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_2
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨  b^{82, 12}_1
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ -p_902 ∨ -b^{82, 12}_0
c  in DIMACS:
 18674  18675 -18676 -902 -18677 0
 18674  18675 -18676 -902  18678 0
 18674  18675 -18676 -902 -18679 0

c  2+1 --> break 
c    (-b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧  p_902) -> break
c  in CNF:
c     b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ -p_902 ∨ break
c  in DIMACS:
 18674 -18675  18676 -902 1162 0


c  2-1 --> 1
c    (-b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧ -p_902) -> (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0)
c  in CNF:
c     b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_2
c     b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_1
c     b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨  b^{82, 12}_0
c  in DIMACS:
 18674 -18675  18676  902 -18677 0
 18674 -18675  18676  902 -18678 0
 18674 -18675  18676  902  18679 0

c  1-1 --> 0
c    (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0 ∧ -p_902) -> (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧ -b^{82, 12}_0)
c  in CNF:
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_2
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_1
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_0
c  in DIMACS:
 18674  18675 -18676  902 -18677 0
 18674  18675 -18676  902 -18678 0
 18674  18675 -18676  902 -18679 0

c  0-1 --> -1
c    (-b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧ -p_902) -> ( b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0)
c  in CNF:
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨  b^{82, 12}_2
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_1
c     b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨  b^{82, 12}_0
c  in DIMACS:
 18674  18675  18676  902  18677 0
 18674  18675  18676  902 -18678 0
 18674  18675  18676  902  18679 0

c  -1-1 --> -2
c    ( b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧  b^{82, 11}_0 ∧ -p_902) -> ( b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0)
c  in CNF:
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨  b^{82, 12}_2
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨  b^{82, 12}_1
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨  p_902 ∨ -b^{82, 12}_0
c  in DIMACS:
-18674  18675 -18676  902  18677 0
-18674  18675 -18676  902  18678 0
-18674  18675 -18676  902 -18679 0

c  -2-1 --> break 
c    ( b^{82, 11}_2 ∧  b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧ -p_902) -> break
c  in CNF:
c    -b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨  b^{82, 11}_0 ∨  p_902 ∨ break
c  in DIMACS:
-18674 -18675  18676  902 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 11}_2 ∧ -b^{82, 11}_1 ∧ -b^{82, 11}_0 ∧ true) 
c  in CNF:
c    -b^{82, 11}_2 ∨  b^{82, 11}_1 ∨  b^{82, 11}_0 ∨ false 
c  in DIMACS:
-18674  18675  18676  0

c  3 does not represent an automaton state.
c    -(-b^{82, 11}_2 ∧  b^{82, 11}_1 ∧  b^{82, 11}_0 ∧ true) 
c  in CNF:
c     b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ false 
c  in DIMACS:
 18674 -18675 -18676  0
c  -3 does not represent an automaton state.
c    -( b^{82, 11}_2 ∧  b^{82, 11}_1 ∧  b^{82, 11}_0 ∧ true) 
c  in CNF:
c    -b^{82, 11}_2 ∨ -b^{82, 11}_1 ∨ -b^{82, 11}_0 ∨ false 
c  in DIMACS:
-18674 -18675 -18676  0

c i = 12
c  -2+1 --> -1
c    ( b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧  p_984) -> ( b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0)
c  in CNF:
c    -b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨  b^{82, 13}_2
c    -b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_1
c    -b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨  b^{82, 13}_0
c  in DIMACS:
-18677 -18678  18679 -984  18680 0
-18677 -18678  18679 -984 -18681 0
-18677 -18678  18679 -984  18682 0

c  -1+1 --> 0
c    ( b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0 ∧  p_984) -> (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧ -b^{82, 13}_0)
c  in CNF:
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_2
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_1
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_0
c  in DIMACS:
-18677  18678 -18679 -984 -18680 0
-18677  18678 -18679 -984 -18681 0
-18677  18678 -18679 -984 -18682 0

c  0+1 --> 1
c    (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧  p_984) -> (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0)
c  in CNF:
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_2
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_1
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨  b^{82, 13}_0
c  in DIMACS:
 18677  18678  18679 -984 -18680 0
 18677  18678  18679 -984 -18681 0
 18677  18678  18679 -984  18682 0

c  1+1 --> 2
c    (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0 ∧  p_984) -> (-b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0)
c  in CNF:
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_2
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨  b^{82, 13}_1
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ -p_984 ∨ -b^{82, 13}_0
c  in DIMACS:
 18677  18678 -18679 -984 -18680 0
 18677  18678 -18679 -984  18681 0
 18677  18678 -18679 -984 -18682 0

c  2+1 --> break 
c    (-b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧  p_984) -> break
c  in CNF:
c     b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 18677 -18678  18679 -984 1162 0


c  2-1 --> 1
c    (-b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧ -p_984) -> (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0)
c  in CNF:
c     b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_2
c     b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_1
c     b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨  b^{82, 13}_0
c  in DIMACS:
 18677 -18678  18679  984 -18680 0
 18677 -18678  18679  984 -18681 0
 18677 -18678  18679  984  18682 0

c  1-1 --> 0
c    (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0 ∧ -p_984) -> (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧ -b^{82, 13}_0)
c  in CNF:
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_2
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_1
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_0
c  in DIMACS:
 18677  18678 -18679  984 -18680 0
 18677  18678 -18679  984 -18681 0
 18677  18678 -18679  984 -18682 0

c  0-1 --> -1
c    (-b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧ -p_984) -> ( b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0)
c  in CNF:
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨  b^{82, 13}_2
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_1
c     b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨  b^{82, 13}_0
c  in DIMACS:
 18677  18678  18679  984  18680 0
 18677  18678  18679  984 -18681 0
 18677  18678  18679  984  18682 0

c  -1-1 --> -2
c    ( b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧  b^{82, 12}_0 ∧ -p_984) -> ( b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0)
c  in CNF:
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨  b^{82, 13}_2
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨  b^{82, 13}_1
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨  p_984 ∨ -b^{82, 13}_0
c  in DIMACS:
-18677  18678 -18679  984  18680 0
-18677  18678 -18679  984  18681 0
-18677  18678 -18679  984 -18682 0

c  -2-1 --> break 
c    ( b^{82, 12}_2 ∧  b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨  b^{82, 12}_0 ∨  p_984 ∨ break
c  in DIMACS:
-18677 -18678  18679  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 12}_2 ∧ -b^{82, 12}_1 ∧ -b^{82, 12}_0 ∧ true) 
c  in CNF:
c    -b^{82, 12}_2 ∨  b^{82, 12}_1 ∨  b^{82, 12}_0 ∨ false 
c  in DIMACS:
-18677  18678  18679  0

c  3 does not represent an automaton state.
c    -(-b^{82, 12}_2 ∧  b^{82, 12}_1 ∧  b^{82, 12}_0 ∧ true) 
c  in CNF:
c     b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ false 
c  in DIMACS:
 18677 -18678 -18679  0
c  -3 does not represent an automaton state.
c    -( b^{82, 12}_2 ∧  b^{82, 12}_1 ∧  b^{82, 12}_0 ∧ true) 
c  in CNF:
c    -b^{82, 12}_2 ∨ -b^{82, 12}_1 ∨ -b^{82, 12}_0 ∨ false 
c  in DIMACS:
-18677 -18678 -18679  0

c i = 13
c  -2+1 --> -1
c    ( b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧  p_1066) -> ( b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0)
c  in CNF:
c    -b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨  b^{82, 14}_2
c    -b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_1
c    -b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨  b^{82, 14}_0
c  in DIMACS:
-18680 -18681  18682 -1066  18683 0
-18680 -18681  18682 -1066 -18684 0
-18680 -18681  18682 -1066  18685 0

c  -1+1 --> 0
c    ( b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0 ∧  p_1066) -> (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧ -b^{82, 14}_0)
c  in CNF:
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_2
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_1
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_0
c  in DIMACS:
-18680  18681 -18682 -1066 -18683 0
-18680  18681 -18682 -1066 -18684 0
-18680  18681 -18682 -1066 -18685 0

c  0+1 --> 1
c    (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧  p_1066) -> (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0)
c  in CNF:
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_2
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_1
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨  b^{82, 14}_0
c  in DIMACS:
 18680  18681  18682 -1066 -18683 0
 18680  18681  18682 -1066 -18684 0
 18680  18681  18682 -1066  18685 0

c  1+1 --> 2
c    (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0 ∧  p_1066) -> (-b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0)
c  in CNF:
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_2
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨  b^{82, 14}_1
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ -p_1066 ∨ -b^{82, 14}_0
c  in DIMACS:
 18680  18681 -18682 -1066 -18683 0
 18680  18681 -18682 -1066  18684 0
 18680  18681 -18682 -1066 -18685 0

c  2+1 --> break 
c    (-b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧  p_1066) -> break
c  in CNF:
c     b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ -p_1066 ∨ break
c  in DIMACS:
 18680 -18681  18682 -1066 1162 0


c  2-1 --> 1
c    (-b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧ -p_1066) -> (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0)
c  in CNF:
c     b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_2
c     b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_1
c     b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨  b^{82, 14}_0
c  in DIMACS:
 18680 -18681  18682  1066 -18683 0
 18680 -18681  18682  1066 -18684 0
 18680 -18681  18682  1066  18685 0

c  1-1 --> 0
c    (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0 ∧ -p_1066) -> (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧ -b^{82, 14}_0)
c  in CNF:
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_2
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_1
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_0
c  in DIMACS:
 18680  18681 -18682  1066 -18683 0
 18680  18681 -18682  1066 -18684 0
 18680  18681 -18682  1066 -18685 0

c  0-1 --> -1
c    (-b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧ -p_1066) -> ( b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0)
c  in CNF:
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨  b^{82, 14}_2
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_1
c     b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨  b^{82, 14}_0
c  in DIMACS:
 18680  18681  18682  1066  18683 0
 18680  18681  18682  1066 -18684 0
 18680  18681  18682  1066  18685 0

c  -1-1 --> -2
c    ( b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧  b^{82, 13}_0 ∧ -p_1066) -> ( b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0)
c  in CNF:
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨  b^{82, 14}_2
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨  b^{82, 14}_1
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨  p_1066 ∨ -b^{82, 14}_0
c  in DIMACS:
-18680  18681 -18682  1066  18683 0
-18680  18681 -18682  1066  18684 0
-18680  18681 -18682  1066 -18685 0

c  -2-1 --> break 
c    ( b^{82, 13}_2 ∧  b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧ -p_1066) -> break
c  in CNF:
c    -b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨  b^{82, 13}_0 ∨  p_1066 ∨ break
c  in DIMACS:
-18680 -18681  18682  1066 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 13}_2 ∧ -b^{82, 13}_1 ∧ -b^{82, 13}_0 ∧ true) 
c  in CNF:
c    -b^{82, 13}_2 ∨  b^{82, 13}_1 ∨  b^{82, 13}_0 ∨ false 
c  in DIMACS:
-18680  18681  18682  0

c  3 does not represent an automaton state.
c    -(-b^{82, 13}_2 ∧  b^{82, 13}_1 ∧  b^{82, 13}_0 ∧ true) 
c  in CNF:
c     b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ false 
c  in DIMACS:
 18680 -18681 -18682  0
c  -3 does not represent an automaton state.
c    -( b^{82, 13}_2 ∧  b^{82, 13}_1 ∧  b^{82, 13}_0 ∧ true) 
c  in CNF:
c    -b^{82, 13}_2 ∨ -b^{82, 13}_1 ∨ -b^{82, 13}_0 ∨ false 
c  in DIMACS:
-18680 -18681 -18682  0

c i = 14
c  -2+1 --> -1
c    ( b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧  p_1148) -> ( b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧  b^{82, 15}_0)
c  in CNF:
c    -b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨  b^{82, 15}_2
c    -b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_1
c    -b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨  b^{82, 15}_0
c  in DIMACS:
-18683 -18684  18685 -1148  18686 0
-18683 -18684  18685 -1148 -18687 0
-18683 -18684  18685 -1148  18688 0

c  -1+1 --> 0
c    ( b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0 ∧  p_1148) -> (-b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧ -b^{82, 15}_0)
c  in CNF:
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_2
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_1
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_0
c  in DIMACS:
-18683  18684 -18685 -1148 -18686 0
-18683  18684 -18685 -1148 -18687 0
-18683  18684 -18685 -1148 -18688 0

c  0+1 --> 1
c    (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧  p_1148) -> (-b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧  b^{82, 15}_0)
c  in CNF:
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_2
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_1
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨  b^{82, 15}_0
c  in DIMACS:
 18683  18684  18685 -1148 -18686 0
 18683  18684  18685 -1148 -18687 0
 18683  18684  18685 -1148  18688 0

c  1+1 --> 2
c    (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0 ∧  p_1148) -> (-b^{82, 15}_2 ∧  b^{82, 15}_1 ∧ -b^{82, 15}_0)
c  in CNF:
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_2
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨  b^{82, 15}_1
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ -p_1148 ∨ -b^{82, 15}_0
c  in DIMACS:
 18683  18684 -18685 -1148 -18686 0
 18683  18684 -18685 -1148  18687 0
 18683  18684 -18685 -1148 -18688 0

c  2+1 --> break 
c    (-b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 18683 -18684  18685 -1148 1162 0


c  2-1 --> 1
c    (-b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧ -p_1148) -> (-b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧  b^{82, 15}_0)
c  in CNF:
c     b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_2
c     b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_1
c     b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨  b^{82, 15}_0
c  in DIMACS:
 18683 -18684  18685  1148 -18686 0
 18683 -18684  18685  1148 -18687 0
 18683 -18684  18685  1148  18688 0

c  1-1 --> 0
c    (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0 ∧ -p_1148) -> (-b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧ -b^{82, 15}_0)
c  in CNF:
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_2
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_1
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_0
c  in DIMACS:
 18683  18684 -18685  1148 -18686 0
 18683  18684 -18685  1148 -18687 0
 18683  18684 -18685  1148 -18688 0

c  0-1 --> -1
c    (-b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧ -p_1148) -> ( b^{82, 15}_2 ∧ -b^{82, 15}_1 ∧  b^{82, 15}_0)
c  in CNF:
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨  b^{82, 15}_2
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_1
c     b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨  b^{82, 15}_0
c  in DIMACS:
 18683  18684  18685  1148  18686 0
 18683  18684  18685  1148 -18687 0
 18683  18684  18685  1148  18688 0

c  -1-1 --> -2
c    ( b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧  b^{82, 14}_0 ∧ -p_1148) -> ( b^{82, 15}_2 ∧  b^{82, 15}_1 ∧ -b^{82, 15}_0)
c  in CNF:
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨  b^{82, 15}_2
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨  b^{82, 15}_1
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨  p_1148 ∨ -b^{82, 15}_0
c  in DIMACS:
-18683  18684 -18685  1148  18686 0
-18683  18684 -18685  1148  18687 0
-18683  18684 -18685  1148 -18688 0

c  -2-1 --> break 
c    ( b^{82, 14}_2 ∧  b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨  b^{82, 14}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-18683 -18684  18685  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{82, 14}_2 ∧ -b^{82, 14}_1 ∧ -b^{82, 14}_0 ∧ true) 
c  in CNF:
c    -b^{82, 14}_2 ∨  b^{82, 14}_1 ∨  b^{82, 14}_0 ∨ false 
c  in DIMACS:
-18683  18684  18685  0

c  3 does not represent an automaton state.
c    -(-b^{82, 14}_2 ∧  b^{82, 14}_1 ∧  b^{82, 14}_0 ∧ true) 
c  in CNF:
c     b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ false 
c  in DIMACS:
 18683 -18684 -18685  0
c  -3 does not represent an automaton state.
c    -( b^{82, 14}_2 ∧  b^{82, 14}_1 ∧  b^{82, 14}_0 ∧ true) 
c  in CNF:
c    -b^{82, 14}_2 ∨ -b^{82, 14}_1 ∨ -b^{82, 14}_0 ∨ false 
c  in DIMACS:
-18683 -18684 -18685  0

c INIT for k = 83
c    -b^{83, 1}_2
c    -b^{83, 1}_1
c    -b^{83, 1}_0
c  in DIMACS:
-18689 0
-18690 0
-18691 0

c Transitions for k = 83
c i = 1
c  -2+1 --> -1
c    ( b^{83, 1}_2 ∧  b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧  p_83) -> ( b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0)
c  in CNF:
c    -b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨  b^{83, 2}_2
c    -b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_1
c    -b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨  b^{83, 2}_0
c  in DIMACS:
-18689 -18690  18691 -83  18692 0
-18689 -18690  18691 -83 -18693 0
-18689 -18690  18691 -83  18694 0

c  -1+1 --> 0
c    ( b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧  b^{83, 1}_0 ∧  p_83) -> (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧ -b^{83, 2}_0)
c  in CNF:
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_2
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_1
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_0
c  in DIMACS:
-18689  18690 -18691 -83 -18692 0
-18689  18690 -18691 -83 -18693 0
-18689  18690 -18691 -83 -18694 0

c  0+1 --> 1
c    (-b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧  p_83) -> (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0)
c  in CNF:
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_2
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_1
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨  b^{83, 2}_0
c  in DIMACS:
 18689  18690  18691 -83 -18692 0
 18689  18690  18691 -83 -18693 0
 18689  18690  18691 -83  18694 0

c  1+1 --> 2
c    (-b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧  b^{83, 1}_0 ∧  p_83) -> (-b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0)
c  in CNF:
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_2
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨  b^{83, 2}_1
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ -p_83 ∨ -b^{83, 2}_0
c  in DIMACS:
 18689  18690 -18691 -83 -18692 0
 18689  18690 -18691 -83  18693 0
 18689  18690 -18691 -83 -18694 0

c  2+1 --> break 
c    (-b^{83, 1}_2 ∧  b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧  p_83) -> break
c  in CNF:
c     b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ -p_83 ∨ break
c  in DIMACS:
 18689 -18690  18691 -83 1162 0


c  2-1 --> 1
c    (-b^{83, 1}_2 ∧  b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧ -p_83) -> (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0)
c  in CNF:
c     b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_2
c     b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_1
c     b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨  b^{83, 2}_0
c  in DIMACS:
 18689 -18690  18691  83 -18692 0
 18689 -18690  18691  83 -18693 0
 18689 -18690  18691  83  18694 0

c  1-1 --> 0
c    (-b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧  b^{83, 1}_0 ∧ -p_83) -> (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧ -b^{83, 2}_0)
c  in CNF:
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_2
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_1
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_0
c  in DIMACS:
 18689  18690 -18691  83 -18692 0
 18689  18690 -18691  83 -18693 0
 18689  18690 -18691  83 -18694 0

c  0-1 --> -1
c    (-b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧ -p_83) -> ( b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0)
c  in CNF:
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨  b^{83, 2}_2
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_1
c     b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨  b^{83, 2}_0
c  in DIMACS:
 18689  18690  18691  83  18692 0
 18689  18690  18691  83 -18693 0
 18689  18690  18691  83  18694 0

c  -1-1 --> -2
c    ( b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧  b^{83, 1}_0 ∧ -p_83) -> ( b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0)
c  in CNF:
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨  b^{83, 2}_2
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨  b^{83, 2}_1
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨  p_83 ∨ -b^{83, 2}_0
c  in DIMACS:
-18689  18690 -18691  83  18692 0
-18689  18690 -18691  83  18693 0
-18689  18690 -18691  83 -18694 0

c  -2-1 --> break 
c    ( b^{83, 1}_2 ∧  b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧ -p_83) -> break
c  in CNF:
c    -b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨  b^{83, 1}_0 ∨  p_83 ∨ break
c  in DIMACS:
-18689 -18690  18691  83 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 1}_2 ∧ -b^{83, 1}_1 ∧ -b^{83, 1}_0 ∧ true) 
c  in CNF:
c    -b^{83, 1}_2 ∨  b^{83, 1}_1 ∨  b^{83, 1}_0 ∨ false 
c  in DIMACS:
-18689  18690  18691  0

c  3 does not represent an automaton state.
c    -(-b^{83, 1}_2 ∧  b^{83, 1}_1 ∧  b^{83, 1}_0 ∧ true) 
c  in CNF:
c     b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ false 
c  in DIMACS:
 18689 -18690 -18691  0
c  -3 does not represent an automaton state.
c    -( b^{83, 1}_2 ∧  b^{83, 1}_1 ∧  b^{83, 1}_0 ∧ true) 
c  in CNF:
c    -b^{83, 1}_2 ∨ -b^{83, 1}_1 ∨ -b^{83, 1}_0 ∨ false 
c  in DIMACS:
-18689 -18690 -18691  0

c i = 2
c  -2+1 --> -1
c    ( b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧  p_166) -> ( b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0)
c  in CNF:
c    -b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨  b^{83, 3}_2
c    -b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_1
c    -b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨  b^{83, 3}_0
c  in DIMACS:
-18692 -18693  18694 -166  18695 0
-18692 -18693  18694 -166 -18696 0
-18692 -18693  18694 -166  18697 0

c  -1+1 --> 0
c    ( b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0 ∧  p_166) -> (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧ -b^{83, 3}_0)
c  in CNF:
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_2
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_1
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_0
c  in DIMACS:
-18692  18693 -18694 -166 -18695 0
-18692  18693 -18694 -166 -18696 0
-18692  18693 -18694 -166 -18697 0

c  0+1 --> 1
c    (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧  p_166) -> (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0)
c  in CNF:
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_2
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_1
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨  b^{83, 3}_0
c  in DIMACS:
 18692  18693  18694 -166 -18695 0
 18692  18693  18694 -166 -18696 0
 18692  18693  18694 -166  18697 0

c  1+1 --> 2
c    (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0 ∧  p_166) -> (-b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0)
c  in CNF:
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_2
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨  b^{83, 3}_1
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ -p_166 ∨ -b^{83, 3}_0
c  in DIMACS:
 18692  18693 -18694 -166 -18695 0
 18692  18693 -18694 -166  18696 0
 18692  18693 -18694 -166 -18697 0

c  2+1 --> break 
c    (-b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧  p_166) -> break
c  in CNF:
c     b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ -p_166 ∨ break
c  in DIMACS:
 18692 -18693  18694 -166 1162 0


c  2-1 --> 1
c    (-b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧ -p_166) -> (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0)
c  in CNF:
c     b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_2
c     b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_1
c     b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨  b^{83, 3}_0
c  in DIMACS:
 18692 -18693  18694  166 -18695 0
 18692 -18693  18694  166 -18696 0
 18692 -18693  18694  166  18697 0

c  1-1 --> 0
c    (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0 ∧ -p_166) -> (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧ -b^{83, 3}_0)
c  in CNF:
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_2
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_1
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_0
c  in DIMACS:
 18692  18693 -18694  166 -18695 0
 18692  18693 -18694  166 -18696 0
 18692  18693 -18694  166 -18697 0

c  0-1 --> -1
c    (-b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧ -p_166) -> ( b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0)
c  in CNF:
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨  b^{83, 3}_2
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_1
c     b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨  b^{83, 3}_0
c  in DIMACS:
 18692  18693  18694  166  18695 0
 18692  18693  18694  166 -18696 0
 18692  18693  18694  166  18697 0

c  -1-1 --> -2
c    ( b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧  b^{83, 2}_0 ∧ -p_166) -> ( b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0)
c  in CNF:
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨  b^{83, 3}_2
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨  b^{83, 3}_1
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨  p_166 ∨ -b^{83, 3}_0
c  in DIMACS:
-18692  18693 -18694  166  18695 0
-18692  18693 -18694  166  18696 0
-18692  18693 -18694  166 -18697 0

c  -2-1 --> break 
c    ( b^{83, 2}_2 ∧  b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧ -p_166) -> break
c  in CNF:
c    -b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨  b^{83, 2}_0 ∨  p_166 ∨ break
c  in DIMACS:
-18692 -18693  18694  166 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 2}_2 ∧ -b^{83, 2}_1 ∧ -b^{83, 2}_0 ∧ true) 
c  in CNF:
c    -b^{83, 2}_2 ∨  b^{83, 2}_1 ∨  b^{83, 2}_0 ∨ false 
c  in DIMACS:
-18692  18693  18694  0

c  3 does not represent an automaton state.
c    -(-b^{83, 2}_2 ∧  b^{83, 2}_1 ∧  b^{83, 2}_0 ∧ true) 
c  in CNF:
c     b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ false 
c  in DIMACS:
 18692 -18693 -18694  0
c  -3 does not represent an automaton state.
c    -( b^{83, 2}_2 ∧  b^{83, 2}_1 ∧  b^{83, 2}_0 ∧ true) 
c  in CNF:
c    -b^{83, 2}_2 ∨ -b^{83, 2}_1 ∨ -b^{83, 2}_0 ∨ false 
c  in DIMACS:
-18692 -18693 -18694  0

c i = 3
c  -2+1 --> -1
c    ( b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧  p_249) -> ( b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0)
c  in CNF:
c    -b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨  b^{83, 4}_2
c    -b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_1
c    -b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨  b^{83, 4}_0
c  in DIMACS:
-18695 -18696  18697 -249  18698 0
-18695 -18696  18697 -249 -18699 0
-18695 -18696  18697 -249  18700 0

c  -1+1 --> 0
c    ( b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0 ∧  p_249) -> (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧ -b^{83, 4}_0)
c  in CNF:
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_2
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_1
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_0
c  in DIMACS:
-18695  18696 -18697 -249 -18698 0
-18695  18696 -18697 -249 -18699 0
-18695  18696 -18697 -249 -18700 0

c  0+1 --> 1
c    (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧  p_249) -> (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0)
c  in CNF:
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_2
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_1
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨  b^{83, 4}_0
c  in DIMACS:
 18695  18696  18697 -249 -18698 0
 18695  18696  18697 -249 -18699 0
 18695  18696  18697 -249  18700 0

c  1+1 --> 2
c    (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0 ∧  p_249) -> (-b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0)
c  in CNF:
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_2
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨  b^{83, 4}_1
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ -p_249 ∨ -b^{83, 4}_0
c  in DIMACS:
 18695  18696 -18697 -249 -18698 0
 18695  18696 -18697 -249  18699 0
 18695  18696 -18697 -249 -18700 0

c  2+1 --> break 
c    (-b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧  p_249) -> break
c  in CNF:
c     b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ -p_249 ∨ break
c  in DIMACS:
 18695 -18696  18697 -249 1162 0


c  2-1 --> 1
c    (-b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧ -p_249) -> (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0)
c  in CNF:
c     b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_2
c     b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_1
c     b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨  b^{83, 4}_0
c  in DIMACS:
 18695 -18696  18697  249 -18698 0
 18695 -18696  18697  249 -18699 0
 18695 -18696  18697  249  18700 0

c  1-1 --> 0
c    (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0 ∧ -p_249) -> (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧ -b^{83, 4}_0)
c  in CNF:
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_2
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_1
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_0
c  in DIMACS:
 18695  18696 -18697  249 -18698 0
 18695  18696 -18697  249 -18699 0
 18695  18696 -18697  249 -18700 0

c  0-1 --> -1
c    (-b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧ -p_249) -> ( b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0)
c  in CNF:
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨  b^{83, 4}_2
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_1
c     b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨  b^{83, 4}_0
c  in DIMACS:
 18695  18696  18697  249  18698 0
 18695  18696  18697  249 -18699 0
 18695  18696  18697  249  18700 0

c  -1-1 --> -2
c    ( b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧  b^{83, 3}_0 ∧ -p_249) -> ( b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0)
c  in CNF:
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨  b^{83, 4}_2
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨  b^{83, 4}_1
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨  p_249 ∨ -b^{83, 4}_0
c  in DIMACS:
-18695  18696 -18697  249  18698 0
-18695  18696 -18697  249  18699 0
-18695  18696 -18697  249 -18700 0

c  -2-1 --> break 
c    ( b^{83, 3}_2 ∧  b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧ -p_249) -> break
c  in CNF:
c    -b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨  b^{83, 3}_0 ∨  p_249 ∨ break
c  in DIMACS:
-18695 -18696  18697  249 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 3}_2 ∧ -b^{83, 3}_1 ∧ -b^{83, 3}_0 ∧ true) 
c  in CNF:
c    -b^{83, 3}_2 ∨  b^{83, 3}_1 ∨  b^{83, 3}_0 ∨ false 
c  in DIMACS:
-18695  18696  18697  0

c  3 does not represent an automaton state.
c    -(-b^{83, 3}_2 ∧  b^{83, 3}_1 ∧  b^{83, 3}_0 ∧ true) 
c  in CNF:
c     b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ false 
c  in DIMACS:
 18695 -18696 -18697  0
c  -3 does not represent an automaton state.
c    -( b^{83, 3}_2 ∧  b^{83, 3}_1 ∧  b^{83, 3}_0 ∧ true) 
c  in CNF:
c    -b^{83, 3}_2 ∨ -b^{83, 3}_1 ∨ -b^{83, 3}_0 ∨ false 
c  in DIMACS:
-18695 -18696 -18697  0

c i = 4
c  -2+1 --> -1
c    ( b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧  p_332) -> ( b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0)
c  in CNF:
c    -b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨  b^{83, 5}_2
c    -b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_1
c    -b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨  b^{83, 5}_0
c  in DIMACS:
-18698 -18699  18700 -332  18701 0
-18698 -18699  18700 -332 -18702 0
-18698 -18699  18700 -332  18703 0

c  -1+1 --> 0
c    ( b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0 ∧  p_332) -> (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧ -b^{83, 5}_0)
c  in CNF:
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_2
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_1
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_0
c  in DIMACS:
-18698  18699 -18700 -332 -18701 0
-18698  18699 -18700 -332 -18702 0
-18698  18699 -18700 -332 -18703 0

c  0+1 --> 1
c    (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧  p_332) -> (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0)
c  in CNF:
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_2
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_1
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨  b^{83, 5}_0
c  in DIMACS:
 18698  18699  18700 -332 -18701 0
 18698  18699  18700 -332 -18702 0
 18698  18699  18700 -332  18703 0

c  1+1 --> 2
c    (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0 ∧  p_332) -> (-b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0)
c  in CNF:
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_2
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨  b^{83, 5}_1
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ -p_332 ∨ -b^{83, 5}_0
c  in DIMACS:
 18698  18699 -18700 -332 -18701 0
 18698  18699 -18700 -332  18702 0
 18698  18699 -18700 -332 -18703 0

c  2+1 --> break 
c    (-b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧  p_332) -> break
c  in CNF:
c     b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 18698 -18699  18700 -332 1162 0


c  2-1 --> 1
c    (-b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧ -p_332) -> (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0)
c  in CNF:
c     b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_2
c     b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_1
c     b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨  b^{83, 5}_0
c  in DIMACS:
 18698 -18699  18700  332 -18701 0
 18698 -18699  18700  332 -18702 0
 18698 -18699  18700  332  18703 0

c  1-1 --> 0
c    (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0 ∧ -p_332) -> (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧ -b^{83, 5}_0)
c  in CNF:
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_2
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_1
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_0
c  in DIMACS:
 18698  18699 -18700  332 -18701 0
 18698  18699 -18700  332 -18702 0
 18698  18699 -18700  332 -18703 0

c  0-1 --> -1
c    (-b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧ -p_332) -> ( b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0)
c  in CNF:
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨  b^{83, 5}_2
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_1
c     b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨  b^{83, 5}_0
c  in DIMACS:
 18698  18699  18700  332  18701 0
 18698  18699  18700  332 -18702 0
 18698  18699  18700  332  18703 0

c  -1-1 --> -2
c    ( b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧  b^{83, 4}_0 ∧ -p_332) -> ( b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0)
c  in CNF:
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨  b^{83, 5}_2
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨  b^{83, 5}_1
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨  p_332 ∨ -b^{83, 5}_0
c  in DIMACS:
-18698  18699 -18700  332  18701 0
-18698  18699 -18700  332  18702 0
-18698  18699 -18700  332 -18703 0

c  -2-1 --> break 
c    ( b^{83, 4}_2 ∧  b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨  b^{83, 4}_0 ∨  p_332 ∨ break
c  in DIMACS:
-18698 -18699  18700  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 4}_2 ∧ -b^{83, 4}_1 ∧ -b^{83, 4}_0 ∧ true) 
c  in CNF:
c    -b^{83, 4}_2 ∨  b^{83, 4}_1 ∨  b^{83, 4}_0 ∨ false 
c  in DIMACS:
-18698  18699  18700  0

c  3 does not represent an automaton state.
c    -(-b^{83, 4}_2 ∧  b^{83, 4}_1 ∧  b^{83, 4}_0 ∧ true) 
c  in CNF:
c     b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ false 
c  in DIMACS:
 18698 -18699 -18700  0
c  -3 does not represent an automaton state.
c    -( b^{83, 4}_2 ∧  b^{83, 4}_1 ∧  b^{83, 4}_0 ∧ true) 
c  in CNF:
c    -b^{83, 4}_2 ∨ -b^{83, 4}_1 ∨ -b^{83, 4}_0 ∨ false 
c  in DIMACS:
-18698 -18699 -18700  0

c i = 5
c  -2+1 --> -1
c    ( b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧  p_415) -> ( b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0)
c  in CNF:
c    -b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨  b^{83, 6}_2
c    -b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_1
c    -b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨  b^{83, 6}_0
c  in DIMACS:
-18701 -18702  18703 -415  18704 0
-18701 -18702  18703 -415 -18705 0
-18701 -18702  18703 -415  18706 0

c  -1+1 --> 0
c    ( b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0 ∧  p_415) -> (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧ -b^{83, 6}_0)
c  in CNF:
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_2
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_1
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_0
c  in DIMACS:
-18701  18702 -18703 -415 -18704 0
-18701  18702 -18703 -415 -18705 0
-18701  18702 -18703 -415 -18706 0

c  0+1 --> 1
c    (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧  p_415) -> (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0)
c  in CNF:
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_2
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_1
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨  b^{83, 6}_0
c  in DIMACS:
 18701  18702  18703 -415 -18704 0
 18701  18702  18703 -415 -18705 0
 18701  18702  18703 -415  18706 0

c  1+1 --> 2
c    (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0 ∧  p_415) -> (-b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0)
c  in CNF:
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_2
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨  b^{83, 6}_1
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ -p_415 ∨ -b^{83, 6}_0
c  in DIMACS:
 18701  18702 -18703 -415 -18704 0
 18701  18702 -18703 -415  18705 0
 18701  18702 -18703 -415 -18706 0

c  2+1 --> break 
c    (-b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧  p_415) -> break
c  in CNF:
c     b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ -p_415 ∨ break
c  in DIMACS:
 18701 -18702  18703 -415 1162 0


c  2-1 --> 1
c    (-b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧ -p_415) -> (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0)
c  in CNF:
c     b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_2
c     b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_1
c     b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨  b^{83, 6}_0
c  in DIMACS:
 18701 -18702  18703  415 -18704 0
 18701 -18702  18703  415 -18705 0
 18701 -18702  18703  415  18706 0

c  1-1 --> 0
c    (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0 ∧ -p_415) -> (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧ -b^{83, 6}_0)
c  in CNF:
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_2
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_1
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_0
c  in DIMACS:
 18701  18702 -18703  415 -18704 0
 18701  18702 -18703  415 -18705 0
 18701  18702 -18703  415 -18706 0

c  0-1 --> -1
c    (-b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧ -p_415) -> ( b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0)
c  in CNF:
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨  b^{83, 6}_2
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_1
c     b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨  b^{83, 6}_0
c  in DIMACS:
 18701  18702  18703  415  18704 0
 18701  18702  18703  415 -18705 0
 18701  18702  18703  415  18706 0

c  -1-1 --> -2
c    ( b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧  b^{83, 5}_0 ∧ -p_415) -> ( b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0)
c  in CNF:
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨  b^{83, 6}_2
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨  b^{83, 6}_1
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨  p_415 ∨ -b^{83, 6}_0
c  in DIMACS:
-18701  18702 -18703  415  18704 0
-18701  18702 -18703  415  18705 0
-18701  18702 -18703  415 -18706 0

c  -2-1 --> break 
c    ( b^{83, 5}_2 ∧  b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧ -p_415) -> break
c  in CNF:
c    -b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨  b^{83, 5}_0 ∨  p_415 ∨ break
c  in DIMACS:
-18701 -18702  18703  415 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 5}_2 ∧ -b^{83, 5}_1 ∧ -b^{83, 5}_0 ∧ true) 
c  in CNF:
c    -b^{83, 5}_2 ∨  b^{83, 5}_1 ∨  b^{83, 5}_0 ∨ false 
c  in DIMACS:
-18701  18702  18703  0

c  3 does not represent an automaton state.
c    -(-b^{83, 5}_2 ∧  b^{83, 5}_1 ∧  b^{83, 5}_0 ∧ true) 
c  in CNF:
c     b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ false 
c  in DIMACS:
 18701 -18702 -18703  0
c  -3 does not represent an automaton state.
c    -( b^{83, 5}_2 ∧  b^{83, 5}_1 ∧  b^{83, 5}_0 ∧ true) 
c  in CNF:
c    -b^{83, 5}_2 ∨ -b^{83, 5}_1 ∨ -b^{83, 5}_0 ∨ false 
c  in DIMACS:
-18701 -18702 -18703  0

c i = 6
c  -2+1 --> -1
c    ( b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧  p_498) -> ( b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0)
c  in CNF:
c    -b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨  b^{83, 7}_2
c    -b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_1
c    -b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨  b^{83, 7}_0
c  in DIMACS:
-18704 -18705  18706 -498  18707 0
-18704 -18705  18706 -498 -18708 0
-18704 -18705  18706 -498  18709 0

c  -1+1 --> 0
c    ( b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0 ∧  p_498) -> (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧ -b^{83, 7}_0)
c  in CNF:
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_2
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_1
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_0
c  in DIMACS:
-18704  18705 -18706 -498 -18707 0
-18704  18705 -18706 -498 -18708 0
-18704  18705 -18706 -498 -18709 0

c  0+1 --> 1
c    (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧  p_498) -> (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0)
c  in CNF:
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_2
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_1
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨  b^{83, 7}_0
c  in DIMACS:
 18704  18705  18706 -498 -18707 0
 18704  18705  18706 -498 -18708 0
 18704  18705  18706 -498  18709 0

c  1+1 --> 2
c    (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0 ∧  p_498) -> (-b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0)
c  in CNF:
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_2
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨  b^{83, 7}_1
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ -p_498 ∨ -b^{83, 7}_0
c  in DIMACS:
 18704  18705 -18706 -498 -18707 0
 18704  18705 -18706 -498  18708 0
 18704  18705 -18706 -498 -18709 0

c  2+1 --> break 
c    (-b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧  p_498) -> break
c  in CNF:
c     b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 18704 -18705  18706 -498 1162 0


c  2-1 --> 1
c    (-b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧ -p_498) -> (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0)
c  in CNF:
c     b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_2
c     b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_1
c     b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨  b^{83, 7}_0
c  in DIMACS:
 18704 -18705  18706  498 -18707 0
 18704 -18705  18706  498 -18708 0
 18704 -18705  18706  498  18709 0

c  1-1 --> 0
c    (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0 ∧ -p_498) -> (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧ -b^{83, 7}_0)
c  in CNF:
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_2
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_1
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_0
c  in DIMACS:
 18704  18705 -18706  498 -18707 0
 18704  18705 -18706  498 -18708 0
 18704  18705 -18706  498 -18709 0

c  0-1 --> -1
c    (-b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧ -p_498) -> ( b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0)
c  in CNF:
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨  b^{83, 7}_2
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_1
c     b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨  b^{83, 7}_0
c  in DIMACS:
 18704  18705  18706  498  18707 0
 18704  18705  18706  498 -18708 0
 18704  18705  18706  498  18709 0

c  -1-1 --> -2
c    ( b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧  b^{83, 6}_0 ∧ -p_498) -> ( b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0)
c  in CNF:
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨  b^{83, 7}_2
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨  b^{83, 7}_1
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨  p_498 ∨ -b^{83, 7}_0
c  in DIMACS:
-18704  18705 -18706  498  18707 0
-18704  18705 -18706  498  18708 0
-18704  18705 -18706  498 -18709 0

c  -2-1 --> break 
c    ( b^{83, 6}_2 ∧  b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨  b^{83, 6}_0 ∨  p_498 ∨ break
c  in DIMACS:
-18704 -18705  18706  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 6}_2 ∧ -b^{83, 6}_1 ∧ -b^{83, 6}_0 ∧ true) 
c  in CNF:
c    -b^{83, 6}_2 ∨  b^{83, 6}_1 ∨  b^{83, 6}_0 ∨ false 
c  in DIMACS:
-18704  18705  18706  0

c  3 does not represent an automaton state.
c    -(-b^{83, 6}_2 ∧  b^{83, 6}_1 ∧  b^{83, 6}_0 ∧ true) 
c  in CNF:
c     b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ false 
c  in DIMACS:
 18704 -18705 -18706  0
c  -3 does not represent an automaton state.
c    -( b^{83, 6}_2 ∧  b^{83, 6}_1 ∧  b^{83, 6}_0 ∧ true) 
c  in CNF:
c    -b^{83, 6}_2 ∨ -b^{83, 6}_1 ∨ -b^{83, 6}_0 ∨ false 
c  in DIMACS:
-18704 -18705 -18706  0

c i = 7
c  -2+1 --> -1
c    ( b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧  p_581) -> ( b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0)
c  in CNF:
c    -b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨  b^{83, 8}_2
c    -b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_1
c    -b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨  b^{83, 8}_0
c  in DIMACS:
-18707 -18708  18709 -581  18710 0
-18707 -18708  18709 -581 -18711 0
-18707 -18708  18709 -581  18712 0

c  -1+1 --> 0
c    ( b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0 ∧  p_581) -> (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧ -b^{83, 8}_0)
c  in CNF:
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_2
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_1
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_0
c  in DIMACS:
-18707  18708 -18709 -581 -18710 0
-18707  18708 -18709 -581 -18711 0
-18707  18708 -18709 -581 -18712 0

c  0+1 --> 1
c    (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧  p_581) -> (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0)
c  in CNF:
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_2
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_1
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨  b^{83, 8}_0
c  in DIMACS:
 18707  18708  18709 -581 -18710 0
 18707  18708  18709 -581 -18711 0
 18707  18708  18709 -581  18712 0

c  1+1 --> 2
c    (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0 ∧  p_581) -> (-b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0)
c  in CNF:
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_2
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨  b^{83, 8}_1
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ -p_581 ∨ -b^{83, 8}_0
c  in DIMACS:
 18707  18708 -18709 -581 -18710 0
 18707  18708 -18709 -581  18711 0
 18707  18708 -18709 -581 -18712 0

c  2+1 --> break 
c    (-b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧  p_581) -> break
c  in CNF:
c     b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ -p_581 ∨ break
c  in DIMACS:
 18707 -18708  18709 -581 1162 0


c  2-1 --> 1
c    (-b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧ -p_581) -> (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0)
c  in CNF:
c     b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_2
c     b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_1
c     b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨  b^{83, 8}_0
c  in DIMACS:
 18707 -18708  18709  581 -18710 0
 18707 -18708  18709  581 -18711 0
 18707 -18708  18709  581  18712 0

c  1-1 --> 0
c    (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0 ∧ -p_581) -> (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧ -b^{83, 8}_0)
c  in CNF:
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_2
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_1
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_0
c  in DIMACS:
 18707  18708 -18709  581 -18710 0
 18707  18708 -18709  581 -18711 0
 18707  18708 -18709  581 -18712 0

c  0-1 --> -1
c    (-b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧ -p_581) -> ( b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0)
c  in CNF:
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨  b^{83, 8}_2
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_1
c     b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨  b^{83, 8}_0
c  in DIMACS:
 18707  18708  18709  581  18710 0
 18707  18708  18709  581 -18711 0
 18707  18708  18709  581  18712 0

c  -1-1 --> -2
c    ( b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧  b^{83, 7}_0 ∧ -p_581) -> ( b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0)
c  in CNF:
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨  b^{83, 8}_2
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨  b^{83, 8}_1
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨  p_581 ∨ -b^{83, 8}_0
c  in DIMACS:
-18707  18708 -18709  581  18710 0
-18707  18708 -18709  581  18711 0
-18707  18708 -18709  581 -18712 0

c  -2-1 --> break 
c    ( b^{83, 7}_2 ∧  b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧ -p_581) -> break
c  in CNF:
c    -b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨  b^{83, 7}_0 ∨  p_581 ∨ break
c  in DIMACS:
-18707 -18708  18709  581 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 7}_2 ∧ -b^{83, 7}_1 ∧ -b^{83, 7}_0 ∧ true) 
c  in CNF:
c    -b^{83, 7}_2 ∨  b^{83, 7}_1 ∨  b^{83, 7}_0 ∨ false 
c  in DIMACS:
-18707  18708  18709  0

c  3 does not represent an automaton state.
c    -(-b^{83, 7}_2 ∧  b^{83, 7}_1 ∧  b^{83, 7}_0 ∧ true) 
c  in CNF:
c     b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ false 
c  in DIMACS:
 18707 -18708 -18709  0
c  -3 does not represent an automaton state.
c    -( b^{83, 7}_2 ∧  b^{83, 7}_1 ∧  b^{83, 7}_0 ∧ true) 
c  in CNF:
c    -b^{83, 7}_2 ∨ -b^{83, 7}_1 ∨ -b^{83, 7}_0 ∨ false 
c  in DIMACS:
-18707 -18708 -18709  0

c i = 8
c  -2+1 --> -1
c    ( b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧  p_664) -> ( b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0)
c  in CNF:
c    -b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨  b^{83, 9}_2
c    -b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_1
c    -b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨  b^{83, 9}_0
c  in DIMACS:
-18710 -18711  18712 -664  18713 0
-18710 -18711  18712 -664 -18714 0
-18710 -18711  18712 -664  18715 0

c  -1+1 --> 0
c    ( b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0 ∧  p_664) -> (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧ -b^{83, 9}_0)
c  in CNF:
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_2
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_1
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_0
c  in DIMACS:
-18710  18711 -18712 -664 -18713 0
-18710  18711 -18712 -664 -18714 0
-18710  18711 -18712 -664 -18715 0

c  0+1 --> 1
c    (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧  p_664) -> (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0)
c  in CNF:
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_2
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_1
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨  b^{83, 9}_0
c  in DIMACS:
 18710  18711  18712 -664 -18713 0
 18710  18711  18712 -664 -18714 0
 18710  18711  18712 -664  18715 0

c  1+1 --> 2
c    (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0 ∧  p_664) -> (-b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0)
c  in CNF:
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_2
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨  b^{83, 9}_1
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ -p_664 ∨ -b^{83, 9}_0
c  in DIMACS:
 18710  18711 -18712 -664 -18713 0
 18710  18711 -18712 -664  18714 0
 18710  18711 -18712 -664 -18715 0

c  2+1 --> break 
c    (-b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧  p_664) -> break
c  in CNF:
c     b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 18710 -18711  18712 -664 1162 0


c  2-1 --> 1
c    (-b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧ -p_664) -> (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0)
c  in CNF:
c     b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_2
c     b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_1
c     b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨  b^{83, 9}_0
c  in DIMACS:
 18710 -18711  18712  664 -18713 0
 18710 -18711  18712  664 -18714 0
 18710 -18711  18712  664  18715 0

c  1-1 --> 0
c    (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0 ∧ -p_664) -> (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧ -b^{83, 9}_0)
c  in CNF:
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_2
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_1
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_0
c  in DIMACS:
 18710  18711 -18712  664 -18713 0
 18710  18711 -18712  664 -18714 0
 18710  18711 -18712  664 -18715 0

c  0-1 --> -1
c    (-b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧ -p_664) -> ( b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0)
c  in CNF:
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨  b^{83, 9}_2
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_1
c     b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨  b^{83, 9}_0
c  in DIMACS:
 18710  18711  18712  664  18713 0
 18710  18711  18712  664 -18714 0
 18710  18711  18712  664  18715 0

c  -1-1 --> -2
c    ( b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧  b^{83, 8}_0 ∧ -p_664) -> ( b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0)
c  in CNF:
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨  b^{83, 9}_2
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨  b^{83, 9}_1
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨  p_664 ∨ -b^{83, 9}_0
c  in DIMACS:
-18710  18711 -18712  664  18713 0
-18710  18711 -18712  664  18714 0
-18710  18711 -18712  664 -18715 0

c  -2-1 --> break 
c    ( b^{83, 8}_2 ∧  b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨  b^{83, 8}_0 ∨  p_664 ∨ break
c  in DIMACS:
-18710 -18711  18712  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 8}_2 ∧ -b^{83, 8}_1 ∧ -b^{83, 8}_0 ∧ true) 
c  in CNF:
c    -b^{83, 8}_2 ∨  b^{83, 8}_1 ∨  b^{83, 8}_0 ∨ false 
c  in DIMACS:
-18710  18711  18712  0

c  3 does not represent an automaton state.
c    -(-b^{83, 8}_2 ∧  b^{83, 8}_1 ∧  b^{83, 8}_0 ∧ true) 
c  in CNF:
c     b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ false 
c  in DIMACS:
 18710 -18711 -18712  0
c  -3 does not represent an automaton state.
c    -( b^{83, 8}_2 ∧  b^{83, 8}_1 ∧  b^{83, 8}_0 ∧ true) 
c  in CNF:
c    -b^{83, 8}_2 ∨ -b^{83, 8}_1 ∨ -b^{83, 8}_0 ∨ false 
c  in DIMACS:
-18710 -18711 -18712  0

c i = 9
c  -2+1 --> -1
c    ( b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧  p_747) -> ( b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0)
c  in CNF:
c    -b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨  b^{83, 10}_2
c    -b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_1
c    -b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨  b^{83, 10}_0
c  in DIMACS:
-18713 -18714  18715 -747  18716 0
-18713 -18714  18715 -747 -18717 0
-18713 -18714  18715 -747  18718 0

c  -1+1 --> 0
c    ( b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0 ∧  p_747) -> (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧ -b^{83, 10}_0)
c  in CNF:
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_2
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_1
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_0
c  in DIMACS:
-18713  18714 -18715 -747 -18716 0
-18713  18714 -18715 -747 -18717 0
-18713  18714 -18715 -747 -18718 0

c  0+1 --> 1
c    (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧  p_747) -> (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0)
c  in CNF:
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_2
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_1
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨  b^{83, 10}_0
c  in DIMACS:
 18713  18714  18715 -747 -18716 0
 18713  18714  18715 -747 -18717 0
 18713  18714  18715 -747  18718 0

c  1+1 --> 2
c    (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0 ∧  p_747) -> (-b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0)
c  in CNF:
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_2
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨  b^{83, 10}_1
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ -p_747 ∨ -b^{83, 10}_0
c  in DIMACS:
 18713  18714 -18715 -747 -18716 0
 18713  18714 -18715 -747  18717 0
 18713  18714 -18715 -747 -18718 0

c  2+1 --> break 
c    (-b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧  p_747) -> break
c  in CNF:
c     b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ -p_747 ∨ break
c  in DIMACS:
 18713 -18714  18715 -747 1162 0


c  2-1 --> 1
c    (-b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧ -p_747) -> (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0)
c  in CNF:
c     b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_2
c     b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_1
c     b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨  b^{83, 10}_0
c  in DIMACS:
 18713 -18714  18715  747 -18716 0
 18713 -18714  18715  747 -18717 0
 18713 -18714  18715  747  18718 0

c  1-1 --> 0
c    (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0 ∧ -p_747) -> (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧ -b^{83, 10}_0)
c  in CNF:
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_2
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_1
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_0
c  in DIMACS:
 18713  18714 -18715  747 -18716 0
 18713  18714 -18715  747 -18717 0
 18713  18714 -18715  747 -18718 0

c  0-1 --> -1
c    (-b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧ -p_747) -> ( b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0)
c  in CNF:
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨  b^{83, 10}_2
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_1
c     b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨  b^{83, 10}_0
c  in DIMACS:
 18713  18714  18715  747  18716 0
 18713  18714  18715  747 -18717 0
 18713  18714  18715  747  18718 0

c  -1-1 --> -2
c    ( b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧  b^{83, 9}_0 ∧ -p_747) -> ( b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0)
c  in CNF:
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨  b^{83, 10}_2
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨  b^{83, 10}_1
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨  p_747 ∨ -b^{83, 10}_0
c  in DIMACS:
-18713  18714 -18715  747  18716 0
-18713  18714 -18715  747  18717 0
-18713  18714 -18715  747 -18718 0

c  -2-1 --> break 
c    ( b^{83, 9}_2 ∧  b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧ -p_747) -> break
c  in CNF:
c    -b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨  b^{83, 9}_0 ∨  p_747 ∨ break
c  in DIMACS:
-18713 -18714  18715  747 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 9}_2 ∧ -b^{83, 9}_1 ∧ -b^{83, 9}_0 ∧ true) 
c  in CNF:
c    -b^{83, 9}_2 ∨  b^{83, 9}_1 ∨  b^{83, 9}_0 ∨ false 
c  in DIMACS:
-18713  18714  18715  0

c  3 does not represent an automaton state.
c    -(-b^{83, 9}_2 ∧  b^{83, 9}_1 ∧  b^{83, 9}_0 ∧ true) 
c  in CNF:
c     b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ false 
c  in DIMACS:
 18713 -18714 -18715  0
c  -3 does not represent an automaton state.
c    -( b^{83, 9}_2 ∧  b^{83, 9}_1 ∧  b^{83, 9}_0 ∧ true) 
c  in CNF:
c    -b^{83, 9}_2 ∨ -b^{83, 9}_1 ∨ -b^{83, 9}_0 ∨ false 
c  in DIMACS:
-18713 -18714 -18715  0

c i = 10
c  -2+1 --> -1
c    ( b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧  p_830) -> ( b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0)
c  in CNF:
c    -b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨  b^{83, 11}_2
c    -b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_1
c    -b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨  b^{83, 11}_0
c  in DIMACS:
-18716 -18717  18718 -830  18719 0
-18716 -18717  18718 -830 -18720 0
-18716 -18717  18718 -830  18721 0

c  -1+1 --> 0
c    ( b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0 ∧  p_830) -> (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧ -b^{83, 11}_0)
c  in CNF:
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_2
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_1
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_0
c  in DIMACS:
-18716  18717 -18718 -830 -18719 0
-18716  18717 -18718 -830 -18720 0
-18716  18717 -18718 -830 -18721 0

c  0+1 --> 1
c    (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧  p_830) -> (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0)
c  in CNF:
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_2
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_1
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨  b^{83, 11}_0
c  in DIMACS:
 18716  18717  18718 -830 -18719 0
 18716  18717  18718 -830 -18720 0
 18716  18717  18718 -830  18721 0

c  1+1 --> 2
c    (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0 ∧  p_830) -> (-b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0)
c  in CNF:
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_2
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨  b^{83, 11}_1
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ -p_830 ∨ -b^{83, 11}_0
c  in DIMACS:
 18716  18717 -18718 -830 -18719 0
 18716  18717 -18718 -830  18720 0
 18716  18717 -18718 -830 -18721 0

c  2+1 --> break 
c    (-b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧  p_830) -> break
c  in CNF:
c     b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 18716 -18717  18718 -830 1162 0


c  2-1 --> 1
c    (-b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧ -p_830) -> (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0)
c  in CNF:
c     b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_2
c     b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_1
c     b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨  b^{83, 11}_0
c  in DIMACS:
 18716 -18717  18718  830 -18719 0
 18716 -18717  18718  830 -18720 0
 18716 -18717  18718  830  18721 0

c  1-1 --> 0
c    (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0 ∧ -p_830) -> (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧ -b^{83, 11}_0)
c  in CNF:
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_2
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_1
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_0
c  in DIMACS:
 18716  18717 -18718  830 -18719 0
 18716  18717 -18718  830 -18720 0
 18716  18717 -18718  830 -18721 0

c  0-1 --> -1
c    (-b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧ -p_830) -> ( b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0)
c  in CNF:
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨  b^{83, 11}_2
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_1
c     b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨  b^{83, 11}_0
c  in DIMACS:
 18716  18717  18718  830  18719 0
 18716  18717  18718  830 -18720 0
 18716  18717  18718  830  18721 0

c  -1-1 --> -2
c    ( b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧  b^{83, 10}_0 ∧ -p_830) -> ( b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0)
c  in CNF:
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨  b^{83, 11}_2
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨  b^{83, 11}_1
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨  p_830 ∨ -b^{83, 11}_0
c  in DIMACS:
-18716  18717 -18718  830  18719 0
-18716  18717 -18718  830  18720 0
-18716  18717 -18718  830 -18721 0

c  -2-1 --> break 
c    ( b^{83, 10}_2 ∧  b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨  b^{83, 10}_0 ∨  p_830 ∨ break
c  in DIMACS:
-18716 -18717  18718  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 10}_2 ∧ -b^{83, 10}_1 ∧ -b^{83, 10}_0 ∧ true) 
c  in CNF:
c    -b^{83, 10}_2 ∨  b^{83, 10}_1 ∨  b^{83, 10}_0 ∨ false 
c  in DIMACS:
-18716  18717  18718  0

c  3 does not represent an automaton state.
c    -(-b^{83, 10}_2 ∧  b^{83, 10}_1 ∧  b^{83, 10}_0 ∧ true) 
c  in CNF:
c     b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ false 
c  in DIMACS:
 18716 -18717 -18718  0
c  -3 does not represent an automaton state.
c    -( b^{83, 10}_2 ∧  b^{83, 10}_1 ∧  b^{83, 10}_0 ∧ true) 
c  in CNF:
c    -b^{83, 10}_2 ∨ -b^{83, 10}_1 ∨ -b^{83, 10}_0 ∨ false 
c  in DIMACS:
-18716 -18717 -18718  0

c i = 11
c  -2+1 --> -1
c    ( b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧  p_913) -> ( b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0)
c  in CNF:
c    -b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨  b^{83, 12}_2
c    -b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_1
c    -b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨  b^{83, 12}_0
c  in DIMACS:
-18719 -18720  18721 -913  18722 0
-18719 -18720  18721 -913 -18723 0
-18719 -18720  18721 -913  18724 0

c  -1+1 --> 0
c    ( b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0 ∧  p_913) -> (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧ -b^{83, 12}_0)
c  in CNF:
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_2
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_1
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_0
c  in DIMACS:
-18719  18720 -18721 -913 -18722 0
-18719  18720 -18721 -913 -18723 0
-18719  18720 -18721 -913 -18724 0

c  0+1 --> 1
c    (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧  p_913) -> (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0)
c  in CNF:
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_2
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_1
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨  b^{83, 12}_0
c  in DIMACS:
 18719  18720  18721 -913 -18722 0
 18719  18720  18721 -913 -18723 0
 18719  18720  18721 -913  18724 0

c  1+1 --> 2
c    (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0 ∧  p_913) -> (-b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0)
c  in CNF:
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_2
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨  b^{83, 12}_1
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ -p_913 ∨ -b^{83, 12}_0
c  in DIMACS:
 18719  18720 -18721 -913 -18722 0
 18719  18720 -18721 -913  18723 0
 18719  18720 -18721 -913 -18724 0

c  2+1 --> break 
c    (-b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧  p_913) -> break
c  in CNF:
c     b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ -p_913 ∨ break
c  in DIMACS:
 18719 -18720  18721 -913 1162 0


c  2-1 --> 1
c    (-b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧ -p_913) -> (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0)
c  in CNF:
c     b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_2
c     b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_1
c     b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨  b^{83, 12}_0
c  in DIMACS:
 18719 -18720  18721  913 -18722 0
 18719 -18720  18721  913 -18723 0
 18719 -18720  18721  913  18724 0

c  1-1 --> 0
c    (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0 ∧ -p_913) -> (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧ -b^{83, 12}_0)
c  in CNF:
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_2
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_1
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_0
c  in DIMACS:
 18719  18720 -18721  913 -18722 0
 18719  18720 -18721  913 -18723 0
 18719  18720 -18721  913 -18724 0

c  0-1 --> -1
c    (-b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧ -p_913) -> ( b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0)
c  in CNF:
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨  b^{83, 12}_2
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_1
c     b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨  b^{83, 12}_0
c  in DIMACS:
 18719  18720  18721  913  18722 0
 18719  18720  18721  913 -18723 0
 18719  18720  18721  913  18724 0

c  -1-1 --> -2
c    ( b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧  b^{83, 11}_0 ∧ -p_913) -> ( b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0)
c  in CNF:
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨  b^{83, 12}_2
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨  b^{83, 12}_1
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨  p_913 ∨ -b^{83, 12}_0
c  in DIMACS:
-18719  18720 -18721  913  18722 0
-18719  18720 -18721  913  18723 0
-18719  18720 -18721  913 -18724 0

c  -2-1 --> break 
c    ( b^{83, 11}_2 ∧  b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧ -p_913) -> break
c  in CNF:
c    -b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨  b^{83, 11}_0 ∨  p_913 ∨ break
c  in DIMACS:
-18719 -18720  18721  913 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 11}_2 ∧ -b^{83, 11}_1 ∧ -b^{83, 11}_0 ∧ true) 
c  in CNF:
c    -b^{83, 11}_2 ∨  b^{83, 11}_1 ∨  b^{83, 11}_0 ∨ false 
c  in DIMACS:
-18719  18720  18721  0

c  3 does not represent an automaton state.
c    -(-b^{83, 11}_2 ∧  b^{83, 11}_1 ∧  b^{83, 11}_0 ∧ true) 
c  in CNF:
c     b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ false 
c  in DIMACS:
 18719 -18720 -18721  0
c  -3 does not represent an automaton state.
c    -( b^{83, 11}_2 ∧  b^{83, 11}_1 ∧  b^{83, 11}_0 ∧ true) 
c  in CNF:
c    -b^{83, 11}_2 ∨ -b^{83, 11}_1 ∨ -b^{83, 11}_0 ∨ false 
c  in DIMACS:
-18719 -18720 -18721  0

c i = 12
c  -2+1 --> -1
c    ( b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧  p_996) -> ( b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0)
c  in CNF:
c    -b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨  b^{83, 13}_2
c    -b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_1
c    -b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨  b^{83, 13}_0
c  in DIMACS:
-18722 -18723  18724 -996  18725 0
-18722 -18723  18724 -996 -18726 0
-18722 -18723  18724 -996  18727 0

c  -1+1 --> 0
c    ( b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0 ∧  p_996) -> (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧ -b^{83, 13}_0)
c  in CNF:
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_2
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_1
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_0
c  in DIMACS:
-18722  18723 -18724 -996 -18725 0
-18722  18723 -18724 -996 -18726 0
-18722  18723 -18724 -996 -18727 0

c  0+1 --> 1
c    (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧  p_996) -> (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0)
c  in CNF:
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_2
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_1
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨  b^{83, 13}_0
c  in DIMACS:
 18722  18723  18724 -996 -18725 0
 18722  18723  18724 -996 -18726 0
 18722  18723  18724 -996  18727 0

c  1+1 --> 2
c    (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0 ∧  p_996) -> (-b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0)
c  in CNF:
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_2
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨  b^{83, 13}_1
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ -p_996 ∨ -b^{83, 13}_0
c  in DIMACS:
 18722  18723 -18724 -996 -18725 0
 18722  18723 -18724 -996  18726 0
 18722  18723 -18724 -996 -18727 0

c  2+1 --> break 
c    (-b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧  p_996) -> break
c  in CNF:
c     b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 18722 -18723  18724 -996 1162 0


c  2-1 --> 1
c    (-b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧ -p_996) -> (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0)
c  in CNF:
c     b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_2
c     b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_1
c     b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨  b^{83, 13}_0
c  in DIMACS:
 18722 -18723  18724  996 -18725 0
 18722 -18723  18724  996 -18726 0
 18722 -18723  18724  996  18727 0

c  1-1 --> 0
c    (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0 ∧ -p_996) -> (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧ -b^{83, 13}_0)
c  in CNF:
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_2
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_1
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_0
c  in DIMACS:
 18722  18723 -18724  996 -18725 0
 18722  18723 -18724  996 -18726 0
 18722  18723 -18724  996 -18727 0

c  0-1 --> -1
c    (-b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧ -p_996) -> ( b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0)
c  in CNF:
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨  b^{83, 13}_2
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_1
c     b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨  b^{83, 13}_0
c  in DIMACS:
 18722  18723  18724  996  18725 0
 18722  18723  18724  996 -18726 0
 18722  18723  18724  996  18727 0

c  -1-1 --> -2
c    ( b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧  b^{83, 12}_0 ∧ -p_996) -> ( b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0)
c  in CNF:
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨  b^{83, 13}_2
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨  b^{83, 13}_1
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨  p_996 ∨ -b^{83, 13}_0
c  in DIMACS:
-18722  18723 -18724  996  18725 0
-18722  18723 -18724  996  18726 0
-18722  18723 -18724  996 -18727 0

c  -2-1 --> break 
c    ( b^{83, 12}_2 ∧  b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨  b^{83, 12}_0 ∨  p_996 ∨ break
c  in DIMACS:
-18722 -18723  18724  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 12}_2 ∧ -b^{83, 12}_1 ∧ -b^{83, 12}_0 ∧ true) 
c  in CNF:
c    -b^{83, 12}_2 ∨  b^{83, 12}_1 ∨  b^{83, 12}_0 ∨ false 
c  in DIMACS:
-18722  18723  18724  0

c  3 does not represent an automaton state.
c    -(-b^{83, 12}_2 ∧  b^{83, 12}_1 ∧  b^{83, 12}_0 ∧ true) 
c  in CNF:
c     b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ false 
c  in DIMACS:
 18722 -18723 -18724  0
c  -3 does not represent an automaton state.
c    -( b^{83, 12}_2 ∧  b^{83, 12}_1 ∧  b^{83, 12}_0 ∧ true) 
c  in CNF:
c    -b^{83, 12}_2 ∨ -b^{83, 12}_1 ∨ -b^{83, 12}_0 ∨ false 
c  in DIMACS:
-18722 -18723 -18724  0

c i = 13
c  -2+1 --> -1
c    ( b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧  p_1079) -> ( b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧  b^{83, 14}_0)
c  in CNF:
c    -b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨  b^{83, 14}_2
c    -b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_1
c    -b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨  b^{83, 14}_0
c  in DIMACS:
-18725 -18726  18727 -1079  18728 0
-18725 -18726  18727 -1079 -18729 0
-18725 -18726  18727 -1079  18730 0

c  -1+1 --> 0
c    ( b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0 ∧  p_1079) -> (-b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧ -b^{83, 14}_0)
c  in CNF:
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_2
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_1
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_0
c  in DIMACS:
-18725  18726 -18727 -1079 -18728 0
-18725  18726 -18727 -1079 -18729 0
-18725  18726 -18727 -1079 -18730 0

c  0+1 --> 1
c    (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧  p_1079) -> (-b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧  b^{83, 14}_0)
c  in CNF:
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_2
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_1
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨  b^{83, 14}_0
c  in DIMACS:
 18725  18726  18727 -1079 -18728 0
 18725  18726  18727 -1079 -18729 0
 18725  18726  18727 -1079  18730 0

c  1+1 --> 2
c    (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0 ∧  p_1079) -> (-b^{83, 14}_2 ∧  b^{83, 14}_1 ∧ -b^{83, 14}_0)
c  in CNF:
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_2
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨  b^{83, 14}_1
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ -p_1079 ∨ -b^{83, 14}_0
c  in DIMACS:
 18725  18726 -18727 -1079 -18728 0
 18725  18726 -18727 -1079  18729 0
 18725  18726 -18727 -1079 -18730 0

c  2+1 --> break 
c    (-b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧  p_1079) -> break
c  in CNF:
c     b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ -p_1079 ∨ break
c  in DIMACS:
 18725 -18726  18727 -1079 1162 0


c  2-1 --> 1
c    (-b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧ -p_1079) -> (-b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧  b^{83, 14}_0)
c  in CNF:
c     b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_2
c     b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_1
c     b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨  b^{83, 14}_0
c  in DIMACS:
 18725 -18726  18727  1079 -18728 0
 18725 -18726  18727  1079 -18729 0
 18725 -18726  18727  1079  18730 0

c  1-1 --> 0
c    (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0 ∧ -p_1079) -> (-b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧ -b^{83, 14}_0)
c  in CNF:
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_2
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_1
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_0
c  in DIMACS:
 18725  18726 -18727  1079 -18728 0
 18725  18726 -18727  1079 -18729 0
 18725  18726 -18727  1079 -18730 0

c  0-1 --> -1
c    (-b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧ -p_1079) -> ( b^{83, 14}_2 ∧ -b^{83, 14}_1 ∧  b^{83, 14}_0)
c  in CNF:
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨  b^{83, 14}_2
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_1
c     b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨  b^{83, 14}_0
c  in DIMACS:
 18725  18726  18727  1079  18728 0
 18725  18726  18727  1079 -18729 0
 18725  18726  18727  1079  18730 0

c  -1-1 --> -2
c    ( b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧  b^{83, 13}_0 ∧ -p_1079) -> ( b^{83, 14}_2 ∧  b^{83, 14}_1 ∧ -b^{83, 14}_0)
c  in CNF:
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨  b^{83, 14}_2
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨  b^{83, 14}_1
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨  p_1079 ∨ -b^{83, 14}_0
c  in DIMACS:
-18725  18726 -18727  1079  18728 0
-18725  18726 -18727  1079  18729 0
-18725  18726 -18727  1079 -18730 0

c  -2-1 --> break 
c    ( b^{83, 13}_2 ∧  b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧ -p_1079) -> break
c  in CNF:
c    -b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨  b^{83, 13}_0 ∨  p_1079 ∨ break
c  in DIMACS:
-18725 -18726  18727  1079 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{83, 13}_2 ∧ -b^{83, 13}_1 ∧ -b^{83, 13}_0 ∧ true) 
c  in CNF:
c    -b^{83, 13}_2 ∨  b^{83, 13}_1 ∨  b^{83, 13}_0 ∨ false 
c  in DIMACS:
-18725  18726  18727  0

c  3 does not represent an automaton state.
c    -(-b^{83, 13}_2 ∧  b^{83, 13}_1 ∧  b^{83, 13}_0 ∧ true) 
c  in CNF:
c     b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ false 
c  in DIMACS:
 18725 -18726 -18727  0
c  -3 does not represent an automaton state.
c    -( b^{83, 13}_2 ∧  b^{83, 13}_1 ∧  b^{83, 13}_0 ∧ true) 
c  in CNF:
c    -b^{83, 13}_2 ∨ -b^{83, 13}_1 ∨ -b^{83, 13}_0 ∨ false 
c  in DIMACS:
-18725 -18726 -18727  0

c INIT for k = 84
c    -b^{84, 1}_2
c    -b^{84, 1}_1
c    -b^{84, 1}_0
c  in DIMACS:
-18731 0
-18732 0
-18733 0

c Transitions for k = 84
c i = 1
c  -2+1 --> -1
c    ( b^{84, 1}_2 ∧  b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧  p_84) -> ( b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0)
c  in CNF:
c    -b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨  b^{84, 2}_2
c    -b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_1
c    -b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨  b^{84, 2}_0
c  in DIMACS:
-18731 -18732  18733 -84  18734 0
-18731 -18732  18733 -84 -18735 0
-18731 -18732  18733 -84  18736 0

c  -1+1 --> 0
c    ( b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧  b^{84, 1}_0 ∧  p_84) -> (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧ -b^{84, 2}_0)
c  in CNF:
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_2
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_1
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_0
c  in DIMACS:
-18731  18732 -18733 -84 -18734 0
-18731  18732 -18733 -84 -18735 0
-18731  18732 -18733 -84 -18736 0

c  0+1 --> 1
c    (-b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧  p_84) -> (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0)
c  in CNF:
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_2
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_1
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨  b^{84, 2}_0
c  in DIMACS:
 18731  18732  18733 -84 -18734 0
 18731  18732  18733 -84 -18735 0
 18731  18732  18733 -84  18736 0

c  1+1 --> 2
c    (-b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧  b^{84, 1}_0 ∧  p_84) -> (-b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0)
c  in CNF:
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_2
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨  b^{84, 2}_1
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ -p_84 ∨ -b^{84, 2}_0
c  in DIMACS:
 18731  18732 -18733 -84 -18734 0
 18731  18732 -18733 -84  18735 0
 18731  18732 -18733 -84 -18736 0

c  2+1 --> break 
c    (-b^{84, 1}_2 ∧  b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧  p_84) -> break
c  in CNF:
c     b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ -p_84 ∨ break
c  in DIMACS:
 18731 -18732  18733 -84 1162 0


c  2-1 --> 1
c    (-b^{84, 1}_2 ∧  b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧ -p_84) -> (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0)
c  in CNF:
c     b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_2
c     b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_1
c     b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨  b^{84, 2}_0
c  in DIMACS:
 18731 -18732  18733  84 -18734 0
 18731 -18732  18733  84 -18735 0
 18731 -18732  18733  84  18736 0

c  1-1 --> 0
c    (-b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧  b^{84, 1}_0 ∧ -p_84) -> (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧ -b^{84, 2}_0)
c  in CNF:
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_2
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_1
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_0
c  in DIMACS:
 18731  18732 -18733  84 -18734 0
 18731  18732 -18733  84 -18735 0
 18731  18732 -18733  84 -18736 0

c  0-1 --> -1
c    (-b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧ -p_84) -> ( b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0)
c  in CNF:
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨  b^{84, 2}_2
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_1
c     b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨  b^{84, 2}_0
c  in DIMACS:
 18731  18732  18733  84  18734 0
 18731  18732  18733  84 -18735 0
 18731  18732  18733  84  18736 0

c  -1-1 --> -2
c    ( b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧  b^{84, 1}_0 ∧ -p_84) -> ( b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0)
c  in CNF:
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨  b^{84, 2}_2
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨  b^{84, 2}_1
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨  p_84 ∨ -b^{84, 2}_0
c  in DIMACS:
-18731  18732 -18733  84  18734 0
-18731  18732 -18733  84  18735 0
-18731  18732 -18733  84 -18736 0

c  -2-1 --> break 
c    ( b^{84, 1}_2 ∧  b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧ -p_84) -> break
c  in CNF:
c    -b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨  b^{84, 1}_0 ∨  p_84 ∨ break
c  in DIMACS:
-18731 -18732  18733  84 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 1}_2 ∧ -b^{84, 1}_1 ∧ -b^{84, 1}_0 ∧ true) 
c  in CNF:
c    -b^{84, 1}_2 ∨  b^{84, 1}_1 ∨  b^{84, 1}_0 ∨ false 
c  in DIMACS:
-18731  18732  18733  0

c  3 does not represent an automaton state.
c    -(-b^{84, 1}_2 ∧  b^{84, 1}_1 ∧  b^{84, 1}_0 ∧ true) 
c  in CNF:
c     b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ false 
c  in DIMACS:
 18731 -18732 -18733  0
c  -3 does not represent an automaton state.
c    -( b^{84, 1}_2 ∧  b^{84, 1}_1 ∧  b^{84, 1}_0 ∧ true) 
c  in CNF:
c    -b^{84, 1}_2 ∨ -b^{84, 1}_1 ∨ -b^{84, 1}_0 ∨ false 
c  in DIMACS:
-18731 -18732 -18733  0

c i = 2
c  -2+1 --> -1
c    ( b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧  p_168) -> ( b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0)
c  in CNF:
c    -b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨  b^{84, 3}_2
c    -b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_1
c    -b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨  b^{84, 3}_0
c  in DIMACS:
-18734 -18735  18736 -168  18737 0
-18734 -18735  18736 -168 -18738 0
-18734 -18735  18736 -168  18739 0

c  -1+1 --> 0
c    ( b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0 ∧  p_168) -> (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧ -b^{84, 3}_0)
c  in CNF:
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_2
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_1
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_0
c  in DIMACS:
-18734  18735 -18736 -168 -18737 0
-18734  18735 -18736 -168 -18738 0
-18734  18735 -18736 -168 -18739 0

c  0+1 --> 1
c    (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧  p_168) -> (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0)
c  in CNF:
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_2
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_1
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨  b^{84, 3}_0
c  in DIMACS:
 18734  18735  18736 -168 -18737 0
 18734  18735  18736 -168 -18738 0
 18734  18735  18736 -168  18739 0

c  1+1 --> 2
c    (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0 ∧  p_168) -> (-b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0)
c  in CNF:
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_2
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨  b^{84, 3}_1
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ -p_168 ∨ -b^{84, 3}_0
c  in DIMACS:
 18734  18735 -18736 -168 -18737 0
 18734  18735 -18736 -168  18738 0
 18734  18735 -18736 -168 -18739 0

c  2+1 --> break 
c    (-b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧  p_168) -> break
c  in CNF:
c     b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 18734 -18735  18736 -168 1162 0


c  2-1 --> 1
c    (-b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧ -p_168) -> (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0)
c  in CNF:
c     b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_2
c     b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_1
c     b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨  b^{84, 3}_0
c  in DIMACS:
 18734 -18735  18736  168 -18737 0
 18734 -18735  18736  168 -18738 0
 18734 -18735  18736  168  18739 0

c  1-1 --> 0
c    (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0 ∧ -p_168) -> (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧ -b^{84, 3}_0)
c  in CNF:
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_2
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_1
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_0
c  in DIMACS:
 18734  18735 -18736  168 -18737 0
 18734  18735 -18736  168 -18738 0
 18734  18735 -18736  168 -18739 0

c  0-1 --> -1
c    (-b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧ -p_168) -> ( b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0)
c  in CNF:
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨  b^{84, 3}_2
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_1
c     b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨  b^{84, 3}_0
c  in DIMACS:
 18734  18735  18736  168  18737 0
 18734  18735  18736  168 -18738 0
 18734  18735  18736  168  18739 0

c  -1-1 --> -2
c    ( b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧  b^{84, 2}_0 ∧ -p_168) -> ( b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0)
c  in CNF:
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨  b^{84, 3}_2
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨  b^{84, 3}_1
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨  p_168 ∨ -b^{84, 3}_0
c  in DIMACS:
-18734  18735 -18736  168  18737 0
-18734  18735 -18736  168  18738 0
-18734  18735 -18736  168 -18739 0

c  -2-1 --> break 
c    ( b^{84, 2}_2 ∧  b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨  b^{84, 2}_0 ∨  p_168 ∨ break
c  in DIMACS:
-18734 -18735  18736  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 2}_2 ∧ -b^{84, 2}_1 ∧ -b^{84, 2}_0 ∧ true) 
c  in CNF:
c    -b^{84, 2}_2 ∨  b^{84, 2}_1 ∨  b^{84, 2}_0 ∨ false 
c  in DIMACS:
-18734  18735  18736  0

c  3 does not represent an automaton state.
c    -(-b^{84, 2}_2 ∧  b^{84, 2}_1 ∧  b^{84, 2}_0 ∧ true) 
c  in CNF:
c     b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ false 
c  in DIMACS:
 18734 -18735 -18736  0
c  -3 does not represent an automaton state.
c    -( b^{84, 2}_2 ∧  b^{84, 2}_1 ∧  b^{84, 2}_0 ∧ true) 
c  in CNF:
c    -b^{84, 2}_2 ∨ -b^{84, 2}_1 ∨ -b^{84, 2}_0 ∨ false 
c  in DIMACS:
-18734 -18735 -18736  0

c i = 3
c  -2+1 --> -1
c    ( b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧  p_252) -> ( b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0)
c  in CNF:
c    -b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨  b^{84, 4}_2
c    -b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_1
c    -b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨  b^{84, 4}_0
c  in DIMACS:
-18737 -18738  18739 -252  18740 0
-18737 -18738  18739 -252 -18741 0
-18737 -18738  18739 -252  18742 0

c  -1+1 --> 0
c    ( b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0 ∧  p_252) -> (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧ -b^{84, 4}_0)
c  in CNF:
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_2
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_1
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_0
c  in DIMACS:
-18737  18738 -18739 -252 -18740 0
-18737  18738 -18739 -252 -18741 0
-18737  18738 -18739 -252 -18742 0

c  0+1 --> 1
c    (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧  p_252) -> (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0)
c  in CNF:
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_2
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_1
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨  b^{84, 4}_0
c  in DIMACS:
 18737  18738  18739 -252 -18740 0
 18737  18738  18739 -252 -18741 0
 18737  18738  18739 -252  18742 0

c  1+1 --> 2
c    (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0 ∧  p_252) -> (-b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0)
c  in CNF:
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_2
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨  b^{84, 4}_1
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ -p_252 ∨ -b^{84, 4}_0
c  in DIMACS:
 18737  18738 -18739 -252 -18740 0
 18737  18738 -18739 -252  18741 0
 18737  18738 -18739 -252 -18742 0

c  2+1 --> break 
c    (-b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧  p_252) -> break
c  in CNF:
c     b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 18737 -18738  18739 -252 1162 0


c  2-1 --> 1
c    (-b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧ -p_252) -> (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0)
c  in CNF:
c     b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_2
c     b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_1
c     b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨  b^{84, 4}_0
c  in DIMACS:
 18737 -18738  18739  252 -18740 0
 18737 -18738  18739  252 -18741 0
 18737 -18738  18739  252  18742 0

c  1-1 --> 0
c    (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0 ∧ -p_252) -> (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧ -b^{84, 4}_0)
c  in CNF:
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_2
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_1
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_0
c  in DIMACS:
 18737  18738 -18739  252 -18740 0
 18737  18738 -18739  252 -18741 0
 18737  18738 -18739  252 -18742 0

c  0-1 --> -1
c    (-b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧ -p_252) -> ( b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0)
c  in CNF:
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨  b^{84, 4}_2
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_1
c     b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨  b^{84, 4}_0
c  in DIMACS:
 18737  18738  18739  252  18740 0
 18737  18738  18739  252 -18741 0
 18737  18738  18739  252  18742 0

c  -1-1 --> -2
c    ( b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧  b^{84, 3}_0 ∧ -p_252) -> ( b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0)
c  in CNF:
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨  b^{84, 4}_2
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨  b^{84, 4}_1
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨  p_252 ∨ -b^{84, 4}_0
c  in DIMACS:
-18737  18738 -18739  252  18740 0
-18737  18738 -18739  252  18741 0
-18737  18738 -18739  252 -18742 0

c  -2-1 --> break 
c    ( b^{84, 3}_2 ∧  b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨  b^{84, 3}_0 ∨  p_252 ∨ break
c  in DIMACS:
-18737 -18738  18739  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 3}_2 ∧ -b^{84, 3}_1 ∧ -b^{84, 3}_0 ∧ true) 
c  in CNF:
c    -b^{84, 3}_2 ∨  b^{84, 3}_1 ∨  b^{84, 3}_0 ∨ false 
c  in DIMACS:
-18737  18738  18739  0

c  3 does not represent an automaton state.
c    -(-b^{84, 3}_2 ∧  b^{84, 3}_1 ∧  b^{84, 3}_0 ∧ true) 
c  in CNF:
c     b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ false 
c  in DIMACS:
 18737 -18738 -18739  0
c  -3 does not represent an automaton state.
c    -( b^{84, 3}_2 ∧  b^{84, 3}_1 ∧  b^{84, 3}_0 ∧ true) 
c  in CNF:
c    -b^{84, 3}_2 ∨ -b^{84, 3}_1 ∨ -b^{84, 3}_0 ∨ false 
c  in DIMACS:
-18737 -18738 -18739  0

c i = 4
c  -2+1 --> -1
c    ( b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧  p_336) -> ( b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0)
c  in CNF:
c    -b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨  b^{84, 5}_2
c    -b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_1
c    -b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨  b^{84, 5}_0
c  in DIMACS:
-18740 -18741  18742 -336  18743 0
-18740 -18741  18742 -336 -18744 0
-18740 -18741  18742 -336  18745 0

c  -1+1 --> 0
c    ( b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0 ∧  p_336) -> (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧ -b^{84, 5}_0)
c  in CNF:
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_2
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_1
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_0
c  in DIMACS:
-18740  18741 -18742 -336 -18743 0
-18740  18741 -18742 -336 -18744 0
-18740  18741 -18742 -336 -18745 0

c  0+1 --> 1
c    (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧  p_336) -> (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0)
c  in CNF:
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_2
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_1
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨  b^{84, 5}_0
c  in DIMACS:
 18740  18741  18742 -336 -18743 0
 18740  18741  18742 -336 -18744 0
 18740  18741  18742 -336  18745 0

c  1+1 --> 2
c    (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0 ∧  p_336) -> (-b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0)
c  in CNF:
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_2
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨  b^{84, 5}_1
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ -p_336 ∨ -b^{84, 5}_0
c  in DIMACS:
 18740  18741 -18742 -336 -18743 0
 18740  18741 -18742 -336  18744 0
 18740  18741 -18742 -336 -18745 0

c  2+1 --> break 
c    (-b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧  p_336) -> break
c  in CNF:
c     b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 18740 -18741  18742 -336 1162 0


c  2-1 --> 1
c    (-b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧ -p_336) -> (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0)
c  in CNF:
c     b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_2
c     b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_1
c     b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨  b^{84, 5}_0
c  in DIMACS:
 18740 -18741  18742  336 -18743 0
 18740 -18741  18742  336 -18744 0
 18740 -18741  18742  336  18745 0

c  1-1 --> 0
c    (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0 ∧ -p_336) -> (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧ -b^{84, 5}_0)
c  in CNF:
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_2
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_1
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_0
c  in DIMACS:
 18740  18741 -18742  336 -18743 0
 18740  18741 -18742  336 -18744 0
 18740  18741 -18742  336 -18745 0

c  0-1 --> -1
c    (-b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧ -p_336) -> ( b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0)
c  in CNF:
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨  b^{84, 5}_2
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_1
c     b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨  b^{84, 5}_0
c  in DIMACS:
 18740  18741  18742  336  18743 0
 18740  18741  18742  336 -18744 0
 18740  18741  18742  336  18745 0

c  -1-1 --> -2
c    ( b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧  b^{84, 4}_0 ∧ -p_336) -> ( b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0)
c  in CNF:
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨  b^{84, 5}_2
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨  b^{84, 5}_1
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨  p_336 ∨ -b^{84, 5}_0
c  in DIMACS:
-18740  18741 -18742  336  18743 0
-18740  18741 -18742  336  18744 0
-18740  18741 -18742  336 -18745 0

c  -2-1 --> break 
c    ( b^{84, 4}_2 ∧  b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨  b^{84, 4}_0 ∨  p_336 ∨ break
c  in DIMACS:
-18740 -18741  18742  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 4}_2 ∧ -b^{84, 4}_1 ∧ -b^{84, 4}_0 ∧ true) 
c  in CNF:
c    -b^{84, 4}_2 ∨  b^{84, 4}_1 ∨  b^{84, 4}_0 ∨ false 
c  in DIMACS:
-18740  18741  18742  0

c  3 does not represent an automaton state.
c    -(-b^{84, 4}_2 ∧  b^{84, 4}_1 ∧  b^{84, 4}_0 ∧ true) 
c  in CNF:
c     b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ false 
c  in DIMACS:
 18740 -18741 -18742  0
c  -3 does not represent an automaton state.
c    -( b^{84, 4}_2 ∧  b^{84, 4}_1 ∧  b^{84, 4}_0 ∧ true) 
c  in CNF:
c    -b^{84, 4}_2 ∨ -b^{84, 4}_1 ∨ -b^{84, 4}_0 ∨ false 
c  in DIMACS:
-18740 -18741 -18742  0

c i = 5
c  -2+1 --> -1
c    ( b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧  p_420) -> ( b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0)
c  in CNF:
c    -b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨  b^{84, 6}_2
c    -b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_1
c    -b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨  b^{84, 6}_0
c  in DIMACS:
-18743 -18744  18745 -420  18746 0
-18743 -18744  18745 -420 -18747 0
-18743 -18744  18745 -420  18748 0

c  -1+1 --> 0
c    ( b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0 ∧  p_420) -> (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧ -b^{84, 6}_0)
c  in CNF:
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_2
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_1
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_0
c  in DIMACS:
-18743  18744 -18745 -420 -18746 0
-18743  18744 -18745 -420 -18747 0
-18743  18744 -18745 -420 -18748 0

c  0+1 --> 1
c    (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧  p_420) -> (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0)
c  in CNF:
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_2
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_1
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨  b^{84, 6}_0
c  in DIMACS:
 18743  18744  18745 -420 -18746 0
 18743  18744  18745 -420 -18747 0
 18743  18744  18745 -420  18748 0

c  1+1 --> 2
c    (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0 ∧  p_420) -> (-b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0)
c  in CNF:
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_2
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨  b^{84, 6}_1
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ -p_420 ∨ -b^{84, 6}_0
c  in DIMACS:
 18743  18744 -18745 -420 -18746 0
 18743  18744 -18745 -420  18747 0
 18743  18744 -18745 -420 -18748 0

c  2+1 --> break 
c    (-b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧  p_420) -> break
c  in CNF:
c     b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 18743 -18744  18745 -420 1162 0


c  2-1 --> 1
c    (-b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧ -p_420) -> (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0)
c  in CNF:
c     b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_2
c     b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_1
c     b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨  b^{84, 6}_0
c  in DIMACS:
 18743 -18744  18745  420 -18746 0
 18743 -18744  18745  420 -18747 0
 18743 -18744  18745  420  18748 0

c  1-1 --> 0
c    (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0 ∧ -p_420) -> (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧ -b^{84, 6}_0)
c  in CNF:
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_2
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_1
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_0
c  in DIMACS:
 18743  18744 -18745  420 -18746 0
 18743  18744 -18745  420 -18747 0
 18743  18744 -18745  420 -18748 0

c  0-1 --> -1
c    (-b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧ -p_420) -> ( b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0)
c  in CNF:
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨  b^{84, 6}_2
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_1
c     b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨  b^{84, 6}_0
c  in DIMACS:
 18743  18744  18745  420  18746 0
 18743  18744  18745  420 -18747 0
 18743  18744  18745  420  18748 0

c  -1-1 --> -2
c    ( b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧  b^{84, 5}_0 ∧ -p_420) -> ( b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0)
c  in CNF:
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨  b^{84, 6}_2
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨  b^{84, 6}_1
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨  p_420 ∨ -b^{84, 6}_0
c  in DIMACS:
-18743  18744 -18745  420  18746 0
-18743  18744 -18745  420  18747 0
-18743  18744 -18745  420 -18748 0

c  -2-1 --> break 
c    ( b^{84, 5}_2 ∧  b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨  b^{84, 5}_0 ∨  p_420 ∨ break
c  in DIMACS:
-18743 -18744  18745  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 5}_2 ∧ -b^{84, 5}_1 ∧ -b^{84, 5}_0 ∧ true) 
c  in CNF:
c    -b^{84, 5}_2 ∨  b^{84, 5}_1 ∨  b^{84, 5}_0 ∨ false 
c  in DIMACS:
-18743  18744  18745  0

c  3 does not represent an automaton state.
c    -(-b^{84, 5}_2 ∧  b^{84, 5}_1 ∧  b^{84, 5}_0 ∧ true) 
c  in CNF:
c     b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ false 
c  in DIMACS:
 18743 -18744 -18745  0
c  -3 does not represent an automaton state.
c    -( b^{84, 5}_2 ∧  b^{84, 5}_1 ∧  b^{84, 5}_0 ∧ true) 
c  in CNF:
c    -b^{84, 5}_2 ∨ -b^{84, 5}_1 ∨ -b^{84, 5}_0 ∨ false 
c  in DIMACS:
-18743 -18744 -18745  0

c i = 6
c  -2+1 --> -1
c    ( b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧  p_504) -> ( b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0)
c  in CNF:
c    -b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨  b^{84, 7}_2
c    -b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_1
c    -b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨  b^{84, 7}_0
c  in DIMACS:
-18746 -18747  18748 -504  18749 0
-18746 -18747  18748 -504 -18750 0
-18746 -18747  18748 -504  18751 0

c  -1+1 --> 0
c    ( b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0 ∧  p_504) -> (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧ -b^{84, 7}_0)
c  in CNF:
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_2
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_1
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_0
c  in DIMACS:
-18746  18747 -18748 -504 -18749 0
-18746  18747 -18748 -504 -18750 0
-18746  18747 -18748 -504 -18751 0

c  0+1 --> 1
c    (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧  p_504) -> (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0)
c  in CNF:
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_2
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_1
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨  b^{84, 7}_0
c  in DIMACS:
 18746  18747  18748 -504 -18749 0
 18746  18747  18748 -504 -18750 0
 18746  18747  18748 -504  18751 0

c  1+1 --> 2
c    (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0 ∧  p_504) -> (-b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0)
c  in CNF:
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_2
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨  b^{84, 7}_1
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ -p_504 ∨ -b^{84, 7}_0
c  in DIMACS:
 18746  18747 -18748 -504 -18749 0
 18746  18747 -18748 -504  18750 0
 18746  18747 -18748 -504 -18751 0

c  2+1 --> break 
c    (-b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧  p_504) -> break
c  in CNF:
c     b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 18746 -18747  18748 -504 1162 0


c  2-1 --> 1
c    (-b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧ -p_504) -> (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0)
c  in CNF:
c     b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_2
c     b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_1
c     b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨  b^{84, 7}_0
c  in DIMACS:
 18746 -18747  18748  504 -18749 0
 18746 -18747  18748  504 -18750 0
 18746 -18747  18748  504  18751 0

c  1-1 --> 0
c    (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0 ∧ -p_504) -> (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧ -b^{84, 7}_0)
c  in CNF:
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_2
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_1
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_0
c  in DIMACS:
 18746  18747 -18748  504 -18749 0
 18746  18747 -18748  504 -18750 0
 18746  18747 -18748  504 -18751 0

c  0-1 --> -1
c    (-b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧ -p_504) -> ( b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0)
c  in CNF:
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨  b^{84, 7}_2
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_1
c     b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨  b^{84, 7}_0
c  in DIMACS:
 18746  18747  18748  504  18749 0
 18746  18747  18748  504 -18750 0
 18746  18747  18748  504  18751 0

c  -1-1 --> -2
c    ( b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧  b^{84, 6}_0 ∧ -p_504) -> ( b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0)
c  in CNF:
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨  b^{84, 7}_2
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨  b^{84, 7}_1
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨  p_504 ∨ -b^{84, 7}_0
c  in DIMACS:
-18746  18747 -18748  504  18749 0
-18746  18747 -18748  504  18750 0
-18746  18747 -18748  504 -18751 0

c  -2-1 --> break 
c    ( b^{84, 6}_2 ∧  b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨  b^{84, 6}_0 ∨  p_504 ∨ break
c  in DIMACS:
-18746 -18747  18748  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 6}_2 ∧ -b^{84, 6}_1 ∧ -b^{84, 6}_0 ∧ true) 
c  in CNF:
c    -b^{84, 6}_2 ∨  b^{84, 6}_1 ∨  b^{84, 6}_0 ∨ false 
c  in DIMACS:
-18746  18747  18748  0

c  3 does not represent an automaton state.
c    -(-b^{84, 6}_2 ∧  b^{84, 6}_1 ∧  b^{84, 6}_0 ∧ true) 
c  in CNF:
c     b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ false 
c  in DIMACS:
 18746 -18747 -18748  0
c  -3 does not represent an automaton state.
c    -( b^{84, 6}_2 ∧  b^{84, 6}_1 ∧  b^{84, 6}_0 ∧ true) 
c  in CNF:
c    -b^{84, 6}_2 ∨ -b^{84, 6}_1 ∨ -b^{84, 6}_0 ∨ false 
c  in DIMACS:
-18746 -18747 -18748  0

c i = 7
c  -2+1 --> -1
c    ( b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧  p_588) -> ( b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0)
c  in CNF:
c    -b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨  b^{84, 8}_2
c    -b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_1
c    -b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨  b^{84, 8}_0
c  in DIMACS:
-18749 -18750  18751 -588  18752 0
-18749 -18750  18751 -588 -18753 0
-18749 -18750  18751 -588  18754 0

c  -1+1 --> 0
c    ( b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0 ∧  p_588) -> (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧ -b^{84, 8}_0)
c  in CNF:
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_2
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_1
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_0
c  in DIMACS:
-18749  18750 -18751 -588 -18752 0
-18749  18750 -18751 -588 -18753 0
-18749  18750 -18751 -588 -18754 0

c  0+1 --> 1
c    (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧  p_588) -> (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0)
c  in CNF:
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_2
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_1
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨  b^{84, 8}_0
c  in DIMACS:
 18749  18750  18751 -588 -18752 0
 18749  18750  18751 -588 -18753 0
 18749  18750  18751 -588  18754 0

c  1+1 --> 2
c    (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0 ∧  p_588) -> (-b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0)
c  in CNF:
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_2
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨  b^{84, 8}_1
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ -p_588 ∨ -b^{84, 8}_0
c  in DIMACS:
 18749  18750 -18751 -588 -18752 0
 18749  18750 -18751 -588  18753 0
 18749  18750 -18751 -588 -18754 0

c  2+1 --> break 
c    (-b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧  p_588) -> break
c  in CNF:
c     b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 18749 -18750  18751 -588 1162 0


c  2-1 --> 1
c    (-b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧ -p_588) -> (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0)
c  in CNF:
c     b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_2
c     b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_1
c     b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨  b^{84, 8}_0
c  in DIMACS:
 18749 -18750  18751  588 -18752 0
 18749 -18750  18751  588 -18753 0
 18749 -18750  18751  588  18754 0

c  1-1 --> 0
c    (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0 ∧ -p_588) -> (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧ -b^{84, 8}_0)
c  in CNF:
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_2
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_1
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_0
c  in DIMACS:
 18749  18750 -18751  588 -18752 0
 18749  18750 -18751  588 -18753 0
 18749  18750 -18751  588 -18754 0

c  0-1 --> -1
c    (-b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧ -p_588) -> ( b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0)
c  in CNF:
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨  b^{84, 8}_2
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_1
c     b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨  b^{84, 8}_0
c  in DIMACS:
 18749  18750  18751  588  18752 0
 18749  18750  18751  588 -18753 0
 18749  18750  18751  588  18754 0

c  -1-1 --> -2
c    ( b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧  b^{84, 7}_0 ∧ -p_588) -> ( b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0)
c  in CNF:
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨  b^{84, 8}_2
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨  b^{84, 8}_1
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨  p_588 ∨ -b^{84, 8}_0
c  in DIMACS:
-18749  18750 -18751  588  18752 0
-18749  18750 -18751  588  18753 0
-18749  18750 -18751  588 -18754 0

c  -2-1 --> break 
c    ( b^{84, 7}_2 ∧  b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨  b^{84, 7}_0 ∨  p_588 ∨ break
c  in DIMACS:
-18749 -18750  18751  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 7}_2 ∧ -b^{84, 7}_1 ∧ -b^{84, 7}_0 ∧ true) 
c  in CNF:
c    -b^{84, 7}_2 ∨  b^{84, 7}_1 ∨  b^{84, 7}_0 ∨ false 
c  in DIMACS:
-18749  18750  18751  0

c  3 does not represent an automaton state.
c    -(-b^{84, 7}_2 ∧  b^{84, 7}_1 ∧  b^{84, 7}_0 ∧ true) 
c  in CNF:
c     b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ false 
c  in DIMACS:
 18749 -18750 -18751  0
c  -3 does not represent an automaton state.
c    -( b^{84, 7}_2 ∧  b^{84, 7}_1 ∧  b^{84, 7}_0 ∧ true) 
c  in CNF:
c    -b^{84, 7}_2 ∨ -b^{84, 7}_1 ∨ -b^{84, 7}_0 ∨ false 
c  in DIMACS:
-18749 -18750 -18751  0

c i = 8
c  -2+1 --> -1
c    ( b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧  p_672) -> ( b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0)
c  in CNF:
c    -b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨  b^{84, 9}_2
c    -b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_1
c    -b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨  b^{84, 9}_0
c  in DIMACS:
-18752 -18753  18754 -672  18755 0
-18752 -18753  18754 -672 -18756 0
-18752 -18753  18754 -672  18757 0

c  -1+1 --> 0
c    ( b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0 ∧  p_672) -> (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧ -b^{84, 9}_0)
c  in CNF:
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_2
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_1
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_0
c  in DIMACS:
-18752  18753 -18754 -672 -18755 0
-18752  18753 -18754 -672 -18756 0
-18752  18753 -18754 -672 -18757 0

c  0+1 --> 1
c    (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧  p_672) -> (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0)
c  in CNF:
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_2
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_1
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨  b^{84, 9}_0
c  in DIMACS:
 18752  18753  18754 -672 -18755 0
 18752  18753  18754 -672 -18756 0
 18752  18753  18754 -672  18757 0

c  1+1 --> 2
c    (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0 ∧  p_672) -> (-b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0)
c  in CNF:
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_2
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨  b^{84, 9}_1
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ -p_672 ∨ -b^{84, 9}_0
c  in DIMACS:
 18752  18753 -18754 -672 -18755 0
 18752  18753 -18754 -672  18756 0
 18752  18753 -18754 -672 -18757 0

c  2+1 --> break 
c    (-b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧  p_672) -> break
c  in CNF:
c     b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 18752 -18753  18754 -672 1162 0


c  2-1 --> 1
c    (-b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧ -p_672) -> (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0)
c  in CNF:
c     b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_2
c     b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_1
c     b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨  b^{84, 9}_0
c  in DIMACS:
 18752 -18753  18754  672 -18755 0
 18752 -18753  18754  672 -18756 0
 18752 -18753  18754  672  18757 0

c  1-1 --> 0
c    (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0 ∧ -p_672) -> (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧ -b^{84, 9}_0)
c  in CNF:
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_2
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_1
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_0
c  in DIMACS:
 18752  18753 -18754  672 -18755 0
 18752  18753 -18754  672 -18756 0
 18752  18753 -18754  672 -18757 0

c  0-1 --> -1
c    (-b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧ -p_672) -> ( b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0)
c  in CNF:
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨  b^{84, 9}_2
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_1
c     b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨  b^{84, 9}_0
c  in DIMACS:
 18752  18753  18754  672  18755 0
 18752  18753  18754  672 -18756 0
 18752  18753  18754  672  18757 0

c  -1-1 --> -2
c    ( b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧  b^{84, 8}_0 ∧ -p_672) -> ( b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0)
c  in CNF:
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨  b^{84, 9}_2
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨  b^{84, 9}_1
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨  p_672 ∨ -b^{84, 9}_0
c  in DIMACS:
-18752  18753 -18754  672  18755 0
-18752  18753 -18754  672  18756 0
-18752  18753 -18754  672 -18757 0

c  -2-1 --> break 
c    ( b^{84, 8}_2 ∧  b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨  b^{84, 8}_0 ∨  p_672 ∨ break
c  in DIMACS:
-18752 -18753  18754  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 8}_2 ∧ -b^{84, 8}_1 ∧ -b^{84, 8}_0 ∧ true) 
c  in CNF:
c    -b^{84, 8}_2 ∨  b^{84, 8}_1 ∨  b^{84, 8}_0 ∨ false 
c  in DIMACS:
-18752  18753  18754  0

c  3 does not represent an automaton state.
c    -(-b^{84, 8}_2 ∧  b^{84, 8}_1 ∧  b^{84, 8}_0 ∧ true) 
c  in CNF:
c     b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ false 
c  in DIMACS:
 18752 -18753 -18754  0
c  -3 does not represent an automaton state.
c    -( b^{84, 8}_2 ∧  b^{84, 8}_1 ∧  b^{84, 8}_0 ∧ true) 
c  in CNF:
c    -b^{84, 8}_2 ∨ -b^{84, 8}_1 ∨ -b^{84, 8}_0 ∨ false 
c  in DIMACS:
-18752 -18753 -18754  0

c i = 9
c  -2+1 --> -1
c    ( b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧  p_756) -> ( b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0)
c  in CNF:
c    -b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨  b^{84, 10}_2
c    -b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_1
c    -b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨  b^{84, 10}_0
c  in DIMACS:
-18755 -18756  18757 -756  18758 0
-18755 -18756  18757 -756 -18759 0
-18755 -18756  18757 -756  18760 0

c  -1+1 --> 0
c    ( b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0 ∧  p_756) -> (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧ -b^{84, 10}_0)
c  in CNF:
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_2
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_1
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_0
c  in DIMACS:
-18755  18756 -18757 -756 -18758 0
-18755  18756 -18757 -756 -18759 0
-18755  18756 -18757 -756 -18760 0

c  0+1 --> 1
c    (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧  p_756) -> (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0)
c  in CNF:
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_2
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_1
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨  b^{84, 10}_0
c  in DIMACS:
 18755  18756  18757 -756 -18758 0
 18755  18756  18757 -756 -18759 0
 18755  18756  18757 -756  18760 0

c  1+1 --> 2
c    (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0 ∧  p_756) -> (-b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0)
c  in CNF:
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_2
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨  b^{84, 10}_1
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ -p_756 ∨ -b^{84, 10}_0
c  in DIMACS:
 18755  18756 -18757 -756 -18758 0
 18755  18756 -18757 -756  18759 0
 18755  18756 -18757 -756 -18760 0

c  2+1 --> break 
c    (-b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧  p_756) -> break
c  in CNF:
c     b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 18755 -18756  18757 -756 1162 0


c  2-1 --> 1
c    (-b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧ -p_756) -> (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0)
c  in CNF:
c     b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_2
c     b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_1
c     b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨  b^{84, 10}_0
c  in DIMACS:
 18755 -18756  18757  756 -18758 0
 18755 -18756  18757  756 -18759 0
 18755 -18756  18757  756  18760 0

c  1-1 --> 0
c    (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0 ∧ -p_756) -> (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧ -b^{84, 10}_0)
c  in CNF:
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_2
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_1
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_0
c  in DIMACS:
 18755  18756 -18757  756 -18758 0
 18755  18756 -18757  756 -18759 0
 18755  18756 -18757  756 -18760 0

c  0-1 --> -1
c    (-b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧ -p_756) -> ( b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0)
c  in CNF:
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨  b^{84, 10}_2
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_1
c     b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨  b^{84, 10}_0
c  in DIMACS:
 18755  18756  18757  756  18758 0
 18755  18756  18757  756 -18759 0
 18755  18756  18757  756  18760 0

c  -1-1 --> -2
c    ( b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧  b^{84, 9}_0 ∧ -p_756) -> ( b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0)
c  in CNF:
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨  b^{84, 10}_2
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨  b^{84, 10}_1
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨  p_756 ∨ -b^{84, 10}_0
c  in DIMACS:
-18755  18756 -18757  756  18758 0
-18755  18756 -18757  756  18759 0
-18755  18756 -18757  756 -18760 0

c  -2-1 --> break 
c    ( b^{84, 9}_2 ∧  b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨  b^{84, 9}_0 ∨  p_756 ∨ break
c  in DIMACS:
-18755 -18756  18757  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 9}_2 ∧ -b^{84, 9}_1 ∧ -b^{84, 9}_0 ∧ true) 
c  in CNF:
c    -b^{84, 9}_2 ∨  b^{84, 9}_1 ∨  b^{84, 9}_0 ∨ false 
c  in DIMACS:
-18755  18756  18757  0

c  3 does not represent an automaton state.
c    -(-b^{84, 9}_2 ∧  b^{84, 9}_1 ∧  b^{84, 9}_0 ∧ true) 
c  in CNF:
c     b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ false 
c  in DIMACS:
 18755 -18756 -18757  0
c  -3 does not represent an automaton state.
c    -( b^{84, 9}_2 ∧  b^{84, 9}_1 ∧  b^{84, 9}_0 ∧ true) 
c  in CNF:
c    -b^{84, 9}_2 ∨ -b^{84, 9}_1 ∨ -b^{84, 9}_0 ∨ false 
c  in DIMACS:
-18755 -18756 -18757  0

c i = 10
c  -2+1 --> -1
c    ( b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧  p_840) -> ( b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0)
c  in CNF:
c    -b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨  b^{84, 11}_2
c    -b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_1
c    -b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨  b^{84, 11}_0
c  in DIMACS:
-18758 -18759  18760 -840  18761 0
-18758 -18759  18760 -840 -18762 0
-18758 -18759  18760 -840  18763 0

c  -1+1 --> 0
c    ( b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0 ∧  p_840) -> (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧ -b^{84, 11}_0)
c  in CNF:
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_2
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_1
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_0
c  in DIMACS:
-18758  18759 -18760 -840 -18761 0
-18758  18759 -18760 -840 -18762 0
-18758  18759 -18760 -840 -18763 0

c  0+1 --> 1
c    (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧  p_840) -> (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0)
c  in CNF:
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_2
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_1
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨  b^{84, 11}_0
c  in DIMACS:
 18758  18759  18760 -840 -18761 0
 18758  18759  18760 -840 -18762 0
 18758  18759  18760 -840  18763 0

c  1+1 --> 2
c    (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0 ∧  p_840) -> (-b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0)
c  in CNF:
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_2
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨  b^{84, 11}_1
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ -p_840 ∨ -b^{84, 11}_0
c  in DIMACS:
 18758  18759 -18760 -840 -18761 0
 18758  18759 -18760 -840  18762 0
 18758  18759 -18760 -840 -18763 0

c  2+1 --> break 
c    (-b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧  p_840) -> break
c  in CNF:
c     b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 18758 -18759  18760 -840 1162 0


c  2-1 --> 1
c    (-b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧ -p_840) -> (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0)
c  in CNF:
c     b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_2
c     b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_1
c     b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨  b^{84, 11}_0
c  in DIMACS:
 18758 -18759  18760  840 -18761 0
 18758 -18759  18760  840 -18762 0
 18758 -18759  18760  840  18763 0

c  1-1 --> 0
c    (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0 ∧ -p_840) -> (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧ -b^{84, 11}_0)
c  in CNF:
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_2
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_1
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_0
c  in DIMACS:
 18758  18759 -18760  840 -18761 0
 18758  18759 -18760  840 -18762 0
 18758  18759 -18760  840 -18763 0

c  0-1 --> -1
c    (-b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧ -p_840) -> ( b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0)
c  in CNF:
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨  b^{84, 11}_2
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_1
c     b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨  b^{84, 11}_0
c  in DIMACS:
 18758  18759  18760  840  18761 0
 18758  18759  18760  840 -18762 0
 18758  18759  18760  840  18763 0

c  -1-1 --> -2
c    ( b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧  b^{84, 10}_0 ∧ -p_840) -> ( b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0)
c  in CNF:
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨  b^{84, 11}_2
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨  b^{84, 11}_1
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨  p_840 ∨ -b^{84, 11}_0
c  in DIMACS:
-18758  18759 -18760  840  18761 0
-18758  18759 -18760  840  18762 0
-18758  18759 -18760  840 -18763 0

c  -2-1 --> break 
c    ( b^{84, 10}_2 ∧  b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨  b^{84, 10}_0 ∨  p_840 ∨ break
c  in DIMACS:
-18758 -18759  18760  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 10}_2 ∧ -b^{84, 10}_1 ∧ -b^{84, 10}_0 ∧ true) 
c  in CNF:
c    -b^{84, 10}_2 ∨  b^{84, 10}_1 ∨  b^{84, 10}_0 ∨ false 
c  in DIMACS:
-18758  18759  18760  0

c  3 does not represent an automaton state.
c    -(-b^{84, 10}_2 ∧  b^{84, 10}_1 ∧  b^{84, 10}_0 ∧ true) 
c  in CNF:
c     b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ false 
c  in DIMACS:
 18758 -18759 -18760  0
c  -3 does not represent an automaton state.
c    -( b^{84, 10}_2 ∧  b^{84, 10}_1 ∧  b^{84, 10}_0 ∧ true) 
c  in CNF:
c    -b^{84, 10}_2 ∨ -b^{84, 10}_1 ∨ -b^{84, 10}_0 ∨ false 
c  in DIMACS:
-18758 -18759 -18760  0

c i = 11
c  -2+1 --> -1
c    ( b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧  p_924) -> ( b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0)
c  in CNF:
c    -b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨  b^{84, 12}_2
c    -b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_1
c    -b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨  b^{84, 12}_0
c  in DIMACS:
-18761 -18762  18763 -924  18764 0
-18761 -18762  18763 -924 -18765 0
-18761 -18762  18763 -924  18766 0

c  -1+1 --> 0
c    ( b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0 ∧  p_924) -> (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧ -b^{84, 12}_0)
c  in CNF:
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_2
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_1
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_0
c  in DIMACS:
-18761  18762 -18763 -924 -18764 0
-18761  18762 -18763 -924 -18765 0
-18761  18762 -18763 -924 -18766 0

c  0+1 --> 1
c    (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧  p_924) -> (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0)
c  in CNF:
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_2
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_1
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨  b^{84, 12}_0
c  in DIMACS:
 18761  18762  18763 -924 -18764 0
 18761  18762  18763 -924 -18765 0
 18761  18762  18763 -924  18766 0

c  1+1 --> 2
c    (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0 ∧  p_924) -> (-b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0)
c  in CNF:
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_2
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨  b^{84, 12}_1
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ -p_924 ∨ -b^{84, 12}_0
c  in DIMACS:
 18761  18762 -18763 -924 -18764 0
 18761  18762 -18763 -924  18765 0
 18761  18762 -18763 -924 -18766 0

c  2+1 --> break 
c    (-b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧  p_924) -> break
c  in CNF:
c     b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 18761 -18762  18763 -924 1162 0


c  2-1 --> 1
c    (-b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧ -p_924) -> (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0)
c  in CNF:
c     b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_2
c     b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_1
c     b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨  b^{84, 12}_0
c  in DIMACS:
 18761 -18762  18763  924 -18764 0
 18761 -18762  18763  924 -18765 0
 18761 -18762  18763  924  18766 0

c  1-1 --> 0
c    (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0 ∧ -p_924) -> (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧ -b^{84, 12}_0)
c  in CNF:
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_2
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_1
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_0
c  in DIMACS:
 18761  18762 -18763  924 -18764 0
 18761  18762 -18763  924 -18765 0
 18761  18762 -18763  924 -18766 0

c  0-1 --> -1
c    (-b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧ -p_924) -> ( b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0)
c  in CNF:
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨  b^{84, 12}_2
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_1
c     b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨  b^{84, 12}_0
c  in DIMACS:
 18761  18762  18763  924  18764 0
 18761  18762  18763  924 -18765 0
 18761  18762  18763  924  18766 0

c  -1-1 --> -2
c    ( b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧  b^{84, 11}_0 ∧ -p_924) -> ( b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0)
c  in CNF:
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨  b^{84, 12}_2
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨  b^{84, 12}_1
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨  p_924 ∨ -b^{84, 12}_0
c  in DIMACS:
-18761  18762 -18763  924  18764 0
-18761  18762 -18763  924  18765 0
-18761  18762 -18763  924 -18766 0

c  -2-1 --> break 
c    ( b^{84, 11}_2 ∧  b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨  b^{84, 11}_0 ∨  p_924 ∨ break
c  in DIMACS:
-18761 -18762  18763  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 11}_2 ∧ -b^{84, 11}_1 ∧ -b^{84, 11}_0 ∧ true) 
c  in CNF:
c    -b^{84, 11}_2 ∨  b^{84, 11}_1 ∨  b^{84, 11}_0 ∨ false 
c  in DIMACS:
-18761  18762  18763  0

c  3 does not represent an automaton state.
c    -(-b^{84, 11}_2 ∧  b^{84, 11}_1 ∧  b^{84, 11}_0 ∧ true) 
c  in CNF:
c     b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ false 
c  in DIMACS:
 18761 -18762 -18763  0
c  -3 does not represent an automaton state.
c    -( b^{84, 11}_2 ∧  b^{84, 11}_1 ∧  b^{84, 11}_0 ∧ true) 
c  in CNF:
c    -b^{84, 11}_2 ∨ -b^{84, 11}_1 ∨ -b^{84, 11}_0 ∨ false 
c  in DIMACS:
-18761 -18762 -18763  0

c i = 12
c  -2+1 --> -1
c    ( b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧  p_1008) -> ( b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0)
c  in CNF:
c    -b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨  b^{84, 13}_2
c    -b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_1
c    -b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨  b^{84, 13}_0
c  in DIMACS:
-18764 -18765  18766 -1008  18767 0
-18764 -18765  18766 -1008 -18768 0
-18764 -18765  18766 -1008  18769 0

c  -1+1 --> 0
c    ( b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0 ∧  p_1008) -> (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧ -b^{84, 13}_0)
c  in CNF:
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_2
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_1
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_0
c  in DIMACS:
-18764  18765 -18766 -1008 -18767 0
-18764  18765 -18766 -1008 -18768 0
-18764  18765 -18766 -1008 -18769 0

c  0+1 --> 1
c    (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧  p_1008) -> (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0)
c  in CNF:
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_2
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_1
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨  b^{84, 13}_0
c  in DIMACS:
 18764  18765  18766 -1008 -18767 0
 18764  18765  18766 -1008 -18768 0
 18764  18765  18766 -1008  18769 0

c  1+1 --> 2
c    (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0 ∧  p_1008) -> (-b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0)
c  in CNF:
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_2
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨  b^{84, 13}_1
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ -p_1008 ∨ -b^{84, 13}_0
c  in DIMACS:
 18764  18765 -18766 -1008 -18767 0
 18764  18765 -18766 -1008  18768 0
 18764  18765 -18766 -1008 -18769 0

c  2+1 --> break 
c    (-b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 18764 -18765  18766 -1008 1162 0


c  2-1 --> 1
c    (-b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧ -p_1008) -> (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0)
c  in CNF:
c     b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_2
c     b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_1
c     b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨  b^{84, 13}_0
c  in DIMACS:
 18764 -18765  18766  1008 -18767 0
 18764 -18765  18766  1008 -18768 0
 18764 -18765  18766  1008  18769 0

c  1-1 --> 0
c    (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0 ∧ -p_1008) -> (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧ -b^{84, 13}_0)
c  in CNF:
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_2
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_1
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_0
c  in DIMACS:
 18764  18765 -18766  1008 -18767 0
 18764  18765 -18766  1008 -18768 0
 18764  18765 -18766  1008 -18769 0

c  0-1 --> -1
c    (-b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧ -p_1008) -> ( b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0)
c  in CNF:
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨  b^{84, 13}_2
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_1
c     b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨  b^{84, 13}_0
c  in DIMACS:
 18764  18765  18766  1008  18767 0
 18764  18765  18766  1008 -18768 0
 18764  18765  18766  1008  18769 0

c  -1-1 --> -2
c    ( b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧  b^{84, 12}_0 ∧ -p_1008) -> ( b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0)
c  in CNF:
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨  b^{84, 13}_2
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨  b^{84, 13}_1
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨  p_1008 ∨ -b^{84, 13}_0
c  in DIMACS:
-18764  18765 -18766  1008  18767 0
-18764  18765 -18766  1008  18768 0
-18764  18765 -18766  1008 -18769 0

c  -2-1 --> break 
c    ( b^{84, 12}_2 ∧  b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨  b^{84, 12}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-18764 -18765  18766  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 12}_2 ∧ -b^{84, 12}_1 ∧ -b^{84, 12}_0 ∧ true) 
c  in CNF:
c    -b^{84, 12}_2 ∨  b^{84, 12}_1 ∨  b^{84, 12}_0 ∨ false 
c  in DIMACS:
-18764  18765  18766  0

c  3 does not represent an automaton state.
c    -(-b^{84, 12}_2 ∧  b^{84, 12}_1 ∧  b^{84, 12}_0 ∧ true) 
c  in CNF:
c     b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ false 
c  in DIMACS:
 18764 -18765 -18766  0
c  -3 does not represent an automaton state.
c    -( b^{84, 12}_2 ∧  b^{84, 12}_1 ∧  b^{84, 12}_0 ∧ true) 
c  in CNF:
c    -b^{84, 12}_2 ∨ -b^{84, 12}_1 ∨ -b^{84, 12}_0 ∨ false 
c  in DIMACS:
-18764 -18765 -18766  0

c i = 13
c  -2+1 --> -1
c    ( b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧  p_1092) -> ( b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧  b^{84, 14}_0)
c  in CNF:
c    -b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨  b^{84, 14}_2
c    -b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_1
c    -b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨  b^{84, 14}_0
c  in DIMACS:
-18767 -18768  18769 -1092  18770 0
-18767 -18768  18769 -1092 -18771 0
-18767 -18768  18769 -1092  18772 0

c  -1+1 --> 0
c    ( b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0 ∧  p_1092) -> (-b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧ -b^{84, 14}_0)
c  in CNF:
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_2
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_1
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_0
c  in DIMACS:
-18767  18768 -18769 -1092 -18770 0
-18767  18768 -18769 -1092 -18771 0
-18767  18768 -18769 -1092 -18772 0

c  0+1 --> 1
c    (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧  p_1092) -> (-b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧  b^{84, 14}_0)
c  in CNF:
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_2
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_1
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨  b^{84, 14}_0
c  in DIMACS:
 18767  18768  18769 -1092 -18770 0
 18767  18768  18769 -1092 -18771 0
 18767  18768  18769 -1092  18772 0

c  1+1 --> 2
c    (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0 ∧  p_1092) -> (-b^{84, 14}_2 ∧  b^{84, 14}_1 ∧ -b^{84, 14}_0)
c  in CNF:
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_2
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨  b^{84, 14}_1
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ -p_1092 ∨ -b^{84, 14}_0
c  in DIMACS:
 18767  18768 -18769 -1092 -18770 0
 18767  18768 -18769 -1092  18771 0
 18767  18768 -18769 -1092 -18772 0

c  2+1 --> break 
c    (-b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 18767 -18768  18769 -1092 1162 0


c  2-1 --> 1
c    (-b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧ -p_1092) -> (-b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧  b^{84, 14}_0)
c  in CNF:
c     b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_2
c     b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_1
c     b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨  b^{84, 14}_0
c  in DIMACS:
 18767 -18768  18769  1092 -18770 0
 18767 -18768  18769  1092 -18771 0
 18767 -18768  18769  1092  18772 0

c  1-1 --> 0
c    (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0 ∧ -p_1092) -> (-b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧ -b^{84, 14}_0)
c  in CNF:
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_2
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_1
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_0
c  in DIMACS:
 18767  18768 -18769  1092 -18770 0
 18767  18768 -18769  1092 -18771 0
 18767  18768 -18769  1092 -18772 0

c  0-1 --> -1
c    (-b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧ -p_1092) -> ( b^{84, 14}_2 ∧ -b^{84, 14}_1 ∧  b^{84, 14}_0)
c  in CNF:
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨  b^{84, 14}_2
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_1
c     b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨  b^{84, 14}_0
c  in DIMACS:
 18767  18768  18769  1092  18770 0
 18767  18768  18769  1092 -18771 0
 18767  18768  18769  1092  18772 0

c  -1-1 --> -2
c    ( b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧  b^{84, 13}_0 ∧ -p_1092) -> ( b^{84, 14}_2 ∧  b^{84, 14}_1 ∧ -b^{84, 14}_0)
c  in CNF:
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨  b^{84, 14}_2
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨  b^{84, 14}_1
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨  p_1092 ∨ -b^{84, 14}_0
c  in DIMACS:
-18767  18768 -18769  1092  18770 0
-18767  18768 -18769  1092  18771 0
-18767  18768 -18769  1092 -18772 0

c  -2-1 --> break 
c    ( b^{84, 13}_2 ∧  b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨  b^{84, 13}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-18767 -18768  18769  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{84, 13}_2 ∧ -b^{84, 13}_1 ∧ -b^{84, 13}_0 ∧ true) 
c  in CNF:
c    -b^{84, 13}_2 ∨  b^{84, 13}_1 ∨  b^{84, 13}_0 ∨ false 
c  in DIMACS:
-18767  18768  18769  0

c  3 does not represent an automaton state.
c    -(-b^{84, 13}_2 ∧  b^{84, 13}_1 ∧  b^{84, 13}_0 ∧ true) 
c  in CNF:
c     b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ false 
c  in DIMACS:
 18767 -18768 -18769  0
c  -3 does not represent an automaton state.
c    -( b^{84, 13}_2 ∧  b^{84, 13}_1 ∧  b^{84, 13}_0 ∧ true) 
c  in CNF:
c    -b^{84, 13}_2 ∨ -b^{84, 13}_1 ∨ -b^{84, 13}_0 ∨ false 
c  in DIMACS:
-18767 -18768 -18769  0

c INIT for k = 85
c    -b^{85, 1}_2
c    -b^{85, 1}_1
c    -b^{85, 1}_0
c  in DIMACS:
-18773 0
-18774 0
-18775 0

c Transitions for k = 85
c i = 1
c  -2+1 --> -1
c    ( b^{85, 1}_2 ∧  b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧  p_85) -> ( b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0)
c  in CNF:
c    -b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨  b^{85, 2}_2
c    -b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_1
c    -b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨  b^{85, 2}_0
c  in DIMACS:
-18773 -18774  18775 -85  18776 0
-18773 -18774  18775 -85 -18777 0
-18773 -18774  18775 -85  18778 0

c  -1+1 --> 0
c    ( b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧  b^{85, 1}_0 ∧  p_85) -> (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧ -b^{85, 2}_0)
c  in CNF:
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_2
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_1
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_0
c  in DIMACS:
-18773  18774 -18775 -85 -18776 0
-18773  18774 -18775 -85 -18777 0
-18773  18774 -18775 -85 -18778 0

c  0+1 --> 1
c    (-b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧  p_85) -> (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0)
c  in CNF:
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_2
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_1
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨  b^{85, 2}_0
c  in DIMACS:
 18773  18774  18775 -85 -18776 0
 18773  18774  18775 -85 -18777 0
 18773  18774  18775 -85  18778 0

c  1+1 --> 2
c    (-b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧  b^{85, 1}_0 ∧  p_85) -> (-b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0)
c  in CNF:
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_2
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨  b^{85, 2}_1
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ -p_85 ∨ -b^{85, 2}_0
c  in DIMACS:
 18773  18774 -18775 -85 -18776 0
 18773  18774 -18775 -85  18777 0
 18773  18774 -18775 -85 -18778 0

c  2+1 --> break 
c    (-b^{85, 1}_2 ∧  b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧  p_85) -> break
c  in CNF:
c     b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ -p_85 ∨ break
c  in DIMACS:
 18773 -18774  18775 -85 1162 0


c  2-1 --> 1
c    (-b^{85, 1}_2 ∧  b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧ -p_85) -> (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0)
c  in CNF:
c     b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_2
c     b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_1
c     b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨  b^{85, 2}_0
c  in DIMACS:
 18773 -18774  18775  85 -18776 0
 18773 -18774  18775  85 -18777 0
 18773 -18774  18775  85  18778 0

c  1-1 --> 0
c    (-b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧  b^{85, 1}_0 ∧ -p_85) -> (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧ -b^{85, 2}_0)
c  in CNF:
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_2
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_1
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_0
c  in DIMACS:
 18773  18774 -18775  85 -18776 0
 18773  18774 -18775  85 -18777 0
 18773  18774 -18775  85 -18778 0

c  0-1 --> -1
c    (-b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧ -p_85) -> ( b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0)
c  in CNF:
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨  b^{85, 2}_2
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_1
c     b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨  b^{85, 2}_0
c  in DIMACS:
 18773  18774  18775  85  18776 0
 18773  18774  18775  85 -18777 0
 18773  18774  18775  85  18778 0

c  -1-1 --> -2
c    ( b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧  b^{85, 1}_0 ∧ -p_85) -> ( b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0)
c  in CNF:
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨  b^{85, 2}_2
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨  b^{85, 2}_1
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨  p_85 ∨ -b^{85, 2}_0
c  in DIMACS:
-18773  18774 -18775  85  18776 0
-18773  18774 -18775  85  18777 0
-18773  18774 -18775  85 -18778 0

c  -2-1 --> break 
c    ( b^{85, 1}_2 ∧  b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧ -p_85) -> break
c  in CNF:
c    -b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨  b^{85, 1}_0 ∨  p_85 ∨ break
c  in DIMACS:
-18773 -18774  18775  85 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 1}_2 ∧ -b^{85, 1}_1 ∧ -b^{85, 1}_0 ∧ true) 
c  in CNF:
c    -b^{85, 1}_2 ∨  b^{85, 1}_1 ∨  b^{85, 1}_0 ∨ false 
c  in DIMACS:
-18773  18774  18775  0

c  3 does not represent an automaton state.
c    -(-b^{85, 1}_2 ∧  b^{85, 1}_1 ∧  b^{85, 1}_0 ∧ true) 
c  in CNF:
c     b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ false 
c  in DIMACS:
 18773 -18774 -18775  0
c  -3 does not represent an automaton state.
c    -( b^{85, 1}_2 ∧  b^{85, 1}_1 ∧  b^{85, 1}_0 ∧ true) 
c  in CNF:
c    -b^{85, 1}_2 ∨ -b^{85, 1}_1 ∨ -b^{85, 1}_0 ∨ false 
c  in DIMACS:
-18773 -18774 -18775  0

c i = 2
c  -2+1 --> -1
c    ( b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧  p_170) -> ( b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0)
c  in CNF:
c    -b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨  b^{85, 3}_2
c    -b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_1
c    -b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨  b^{85, 3}_0
c  in DIMACS:
-18776 -18777  18778 -170  18779 0
-18776 -18777  18778 -170 -18780 0
-18776 -18777  18778 -170  18781 0

c  -1+1 --> 0
c    ( b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0 ∧  p_170) -> (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧ -b^{85, 3}_0)
c  in CNF:
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_2
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_1
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_0
c  in DIMACS:
-18776  18777 -18778 -170 -18779 0
-18776  18777 -18778 -170 -18780 0
-18776  18777 -18778 -170 -18781 0

c  0+1 --> 1
c    (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧  p_170) -> (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0)
c  in CNF:
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_2
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_1
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨  b^{85, 3}_0
c  in DIMACS:
 18776  18777  18778 -170 -18779 0
 18776  18777  18778 -170 -18780 0
 18776  18777  18778 -170  18781 0

c  1+1 --> 2
c    (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0 ∧  p_170) -> (-b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0)
c  in CNF:
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_2
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨  b^{85, 3}_1
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ -p_170 ∨ -b^{85, 3}_0
c  in DIMACS:
 18776  18777 -18778 -170 -18779 0
 18776  18777 -18778 -170  18780 0
 18776  18777 -18778 -170 -18781 0

c  2+1 --> break 
c    (-b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧  p_170) -> break
c  in CNF:
c     b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 18776 -18777  18778 -170 1162 0


c  2-1 --> 1
c    (-b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧ -p_170) -> (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0)
c  in CNF:
c     b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_2
c     b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_1
c     b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨  b^{85, 3}_0
c  in DIMACS:
 18776 -18777  18778  170 -18779 0
 18776 -18777  18778  170 -18780 0
 18776 -18777  18778  170  18781 0

c  1-1 --> 0
c    (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0 ∧ -p_170) -> (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧ -b^{85, 3}_0)
c  in CNF:
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_2
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_1
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_0
c  in DIMACS:
 18776  18777 -18778  170 -18779 0
 18776  18777 -18778  170 -18780 0
 18776  18777 -18778  170 -18781 0

c  0-1 --> -1
c    (-b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧ -p_170) -> ( b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0)
c  in CNF:
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨  b^{85, 3}_2
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_1
c     b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨  b^{85, 3}_0
c  in DIMACS:
 18776  18777  18778  170  18779 0
 18776  18777  18778  170 -18780 0
 18776  18777  18778  170  18781 0

c  -1-1 --> -2
c    ( b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧  b^{85, 2}_0 ∧ -p_170) -> ( b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0)
c  in CNF:
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨  b^{85, 3}_2
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨  b^{85, 3}_1
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨  p_170 ∨ -b^{85, 3}_0
c  in DIMACS:
-18776  18777 -18778  170  18779 0
-18776  18777 -18778  170  18780 0
-18776  18777 -18778  170 -18781 0

c  -2-1 --> break 
c    ( b^{85, 2}_2 ∧  b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨  b^{85, 2}_0 ∨  p_170 ∨ break
c  in DIMACS:
-18776 -18777  18778  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 2}_2 ∧ -b^{85, 2}_1 ∧ -b^{85, 2}_0 ∧ true) 
c  in CNF:
c    -b^{85, 2}_2 ∨  b^{85, 2}_1 ∨  b^{85, 2}_0 ∨ false 
c  in DIMACS:
-18776  18777  18778  0

c  3 does not represent an automaton state.
c    -(-b^{85, 2}_2 ∧  b^{85, 2}_1 ∧  b^{85, 2}_0 ∧ true) 
c  in CNF:
c     b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ false 
c  in DIMACS:
 18776 -18777 -18778  0
c  -3 does not represent an automaton state.
c    -( b^{85, 2}_2 ∧  b^{85, 2}_1 ∧  b^{85, 2}_0 ∧ true) 
c  in CNF:
c    -b^{85, 2}_2 ∨ -b^{85, 2}_1 ∨ -b^{85, 2}_0 ∨ false 
c  in DIMACS:
-18776 -18777 -18778  0

c i = 3
c  -2+1 --> -1
c    ( b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧  p_255) -> ( b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0)
c  in CNF:
c    -b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨  b^{85, 4}_2
c    -b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_1
c    -b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨  b^{85, 4}_0
c  in DIMACS:
-18779 -18780  18781 -255  18782 0
-18779 -18780  18781 -255 -18783 0
-18779 -18780  18781 -255  18784 0

c  -1+1 --> 0
c    ( b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0 ∧  p_255) -> (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧ -b^{85, 4}_0)
c  in CNF:
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_2
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_1
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_0
c  in DIMACS:
-18779  18780 -18781 -255 -18782 0
-18779  18780 -18781 -255 -18783 0
-18779  18780 -18781 -255 -18784 0

c  0+1 --> 1
c    (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧  p_255) -> (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0)
c  in CNF:
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_2
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_1
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨  b^{85, 4}_0
c  in DIMACS:
 18779  18780  18781 -255 -18782 0
 18779  18780  18781 -255 -18783 0
 18779  18780  18781 -255  18784 0

c  1+1 --> 2
c    (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0 ∧  p_255) -> (-b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0)
c  in CNF:
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_2
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨  b^{85, 4}_1
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ -p_255 ∨ -b^{85, 4}_0
c  in DIMACS:
 18779  18780 -18781 -255 -18782 0
 18779  18780 -18781 -255  18783 0
 18779  18780 -18781 -255 -18784 0

c  2+1 --> break 
c    (-b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧  p_255) -> break
c  in CNF:
c     b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 18779 -18780  18781 -255 1162 0


c  2-1 --> 1
c    (-b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧ -p_255) -> (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0)
c  in CNF:
c     b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_2
c     b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_1
c     b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨  b^{85, 4}_0
c  in DIMACS:
 18779 -18780  18781  255 -18782 0
 18779 -18780  18781  255 -18783 0
 18779 -18780  18781  255  18784 0

c  1-1 --> 0
c    (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0 ∧ -p_255) -> (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧ -b^{85, 4}_0)
c  in CNF:
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_2
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_1
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_0
c  in DIMACS:
 18779  18780 -18781  255 -18782 0
 18779  18780 -18781  255 -18783 0
 18779  18780 -18781  255 -18784 0

c  0-1 --> -1
c    (-b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧ -p_255) -> ( b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0)
c  in CNF:
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨  b^{85, 4}_2
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_1
c     b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨  b^{85, 4}_0
c  in DIMACS:
 18779  18780  18781  255  18782 0
 18779  18780  18781  255 -18783 0
 18779  18780  18781  255  18784 0

c  -1-1 --> -2
c    ( b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧  b^{85, 3}_0 ∧ -p_255) -> ( b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0)
c  in CNF:
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨  b^{85, 4}_2
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨  b^{85, 4}_1
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨  p_255 ∨ -b^{85, 4}_0
c  in DIMACS:
-18779  18780 -18781  255  18782 0
-18779  18780 -18781  255  18783 0
-18779  18780 -18781  255 -18784 0

c  -2-1 --> break 
c    ( b^{85, 3}_2 ∧  b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨  b^{85, 3}_0 ∨  p_255 ∨ break
c  in DIMACS:
-18779 -18780  18781  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 3}_2 ∧ -b^{85, 3}_1 ∧ -b^{85, 3}_0 ∧ true) 
c  in CNF:
c    -b^{85, 3}_2 ∨  b^{85, 3}_1 ∨  b^{85, 3}_0 ∨ false 
c  in DIMACS:
-18779  18780  18781  0

c  3 does not represent an automaton state.
c    -(-b^{85, 3}_2 ∧  b^{85, 3}_1 ∧  b^{85, 3}_0 ∧ true) 
c  in CNF:
c     b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ false 
c  in DIMACS:
 18779 -18780 -18781  0
c  -3 does not represent an automaton state.
c    -( b^{85, 3}_2 ∧  b^{85, 3}_1 ∧  b^{85, 3}_0 ∧ true) 
c  in CNF:
c    -b^{85, 3}_2 ∨ -b^{85, 3}_1 ∨ -b^{85, 3}_0 ∨ false 
c  in DIMACS:
-18779 -18780 -18781  0

c i = 4
c  -2+1 --> -1
c    ( b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧  p_340) -> ( b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0)
c  in CNF:
c    -b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨  b^{85, 5}_2
c    -b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_1
c    -b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨  b^{85, 5}_0
c  in DIMACS:
-18782 -18783  18784 -340  18785 0
-18782 -18783  18784 -340 -18786 0
-18782 -18783  18784 -340  18787 0

c  -1+1 --> 0
c    ( b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0 ∧  p_340) -> (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧ -b^{85, 5}_0)
c  in CNF:
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_2
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_1
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_0
c  in DIMACS:
-18782  18783 -18784 -340 -18785 0
-18782  18783 -18784 -340 -18786 0
-18782  18783 -18784 -340 -18787 0

c  0+1 --> 1
c    (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧  p_340) -> (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0)
c  in CNF:
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_2
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_1
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨  b^{85, 5}_0
c  in DIMACS:
 18782  18783  18784 -340 -18785 0
 18782  18783  18784 -340 -18786 0
 18782  18783  18784 -340  18787 0

c  1+1 --> 2
c    (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0 ∧  p_340) -> (-b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0)
c  in CNF:
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_2
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨  b^{85, 5}_1
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ -p_340 ∨ -b^{85, 5}_0
c  in DIMACS:
 18782  18783 -18784 -340 -18785 0
 18782  18783 -18784 -340  18786 0
 18782  18783 -18784 -340 -18787 0

c  2+1 --> break 
c    (-b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧  p_340) -> break
c  in CNF:
c     b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 18782 -18783  18784 -340 1162 0


c  2-1 --> 1
c    (-b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧ -p_340) -> (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0)
c  in CNF:
c     b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_2
c     b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_1
c     b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨  b^{85, 5}_0
c  in DIMACS:
 18782 -18783  18784  340 -18785 0
 18782 -18783  18784  340 -18786 0
 18782 -18783  18784  340  18787 0

c  1-1 --> 0
c    (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0 ∧ -p_340) -> (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧ -b^{85, 5}_0)
c  in CNF:
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_2
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_1
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_0
c  in DIMACS:
 18782  18783 -18784  340 -18785 0
 18782  18783 -18784  340 -18786 0
 18782  18783 -18784  340 -18787 0

c  0-1 --> -1
c    (-b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧ -p_340) -> ( b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0)
c  in CNF:
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨  b^{85, 5}_2
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_1
c     b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨  b^{85, 5}_0
c  in DIMACS:
 18782  18783  18784  340  18785 0
 18782  18783  18784  340 -18786 0
 18782  18783  18784  340  18787 0

c  -1-1 --> -2
c    ( b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧  b^{85, 4}_0 ∧ -p_340) -> ( b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0)
c  in CNF:
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨  b^{85, 5}_2
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨  b^{85, 5}_1
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨  p_340 ∨ -b^{85, 5}_0
c  in DIMACS:
-18782  18783 -18784  340  18785 0
-18782  18783 -18784  340  18786 0
-18782  18783 -18784  340 -18787 0

c  -2-1 --> break 
c    ( b^{85, 4}_2 ∧  b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨  b^{85, 4}_0 ∨  p_340 ∨ break
c  in DIMACS:
-18782 -18783  18784  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 4}_2 ∧ -b^{85, 4}_1 ∧ -b^{85, 4}_0 ∧ true) 
c  in CNF:
c    -b^{85, 4}_2 ∨  b^{85, 4}_1 ∨  b^{85, 4}_0 ∨ false 
c  in DIMACS:
-18782  18783  18784  0

c  3 does not represent an automaton state.
c    -(-b^{85, 4}_2 ∧  b^{85, 4}_1 ∧  b^{85, 4}_0 ∧ true) 
c  in CNF:
c     b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ false 
c  in DIMACS:
 18782 -18783 -18784  0
c  -3 does not represent an automaton state.
c    -( b^{85, 4}_2 ∧  b^{85, 4}_1 ∧  b^{85, 4}_0 ∧ true) 
c  in CNF:
c    -b^{85, 4}_2 ∨ -b^{85, 4}_1 ∨ -b^{85, 4}_0 ∨ false 
c  in DIMACS:
-18782 -18783 -18784  0

c i = 5
c  -2+1 --> -1
c    ( b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧  p_425) -> ( b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0)
c  in CNF:
c    -b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨  b^{85, 6}_2
c    -b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_1
c    -b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨  b^{85, 6}_0
c  in DIMACS:
-18785 -18786  18787 -425  18788 0
-18785 -18786  18787 -425 -18789 0
-18785 -18786  18787 -425  18790 0

c  -1+1 --> 0
c    ( b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0 ∧  p_425) -> (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧ -b^{85, 6}_0)
c  in CNF:
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_2
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_1
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_0
c  in DIMACS:
-18785  18786 -18787 -425 -18788 0
-18785  18786 -18787 -425 -18789 0
-18785  18786 -18787 -425 -18790 0

c  0+1 --> 1
c    (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧  p_425) -> (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0)
c  in CNF:
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_2
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_1
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨  b^{85, 6}_0
c  in DIMACS:
 18785  18786  18787 -425 -18788 0
 18785  18786  18787 -425 -18789 0
 18785  18786  18787 -425  18790 0

c  1+1 --> 2
c    (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0 ∧  p_425) -> (-b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0)
c  in CNF:
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_2
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨  b^{85, 6}_1
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ -p_425 ∨ -b^{85, 6}_0
c  in DIMACS:
 18785  18786 -18787 -425 -18788 0
 18785  18786 -18787 -425  18789 0
 18785  18786 -18787 -425 -18790 0

c  2+1 --> break 
c    (-b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧  p_425) -> break
c  in CNF:
c     b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ -p_425 ∨ break
c  in DIMACS:
 18785 -18786  18787 -425 1162 0


c  2-1 --> 1
c    (-b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧ -p_425) -> (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0)
c  in CNF:
c     b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_2
c     b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_1
c     b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨  b^{85, 6}_0
c  in DIMACS:
 18785 -18786  18787  425 -18788 0
 18785 -18786  18787  425 -18789 0
 18785 -18786  18787  425  18790 0

c  1-1 --> 0
c    (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0 ∧ -p_425) -> (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧ -b^{85, 6}_0)
c  in CNF:
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_2
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_1
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_0
c  in DIMACS:
 18785  18786 -18787  425 -18788 0
 18785  18786 -18787  425 -18789 0
 18785  18786 -18787  425 -18790 0

c  0-1 --> -1
c    (-b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧ -p_425) -> ( b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0)
c  in CNF:
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨  b^{85, 6}_2
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_1
c     b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨  b^{85, 6}_0
c  in DIMACS:
 18785  18786  18787  425  18788 0
 18785  18786  18787  425 -18789 0
 18785  18786  18787  425  18790 0

c  -1-1 --> -2
c    ( b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧  b^{85, 5}_0 ∧ -p_425) -> ( b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0)
c  in CNF:
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨  b^{85, 6}_2
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨  b^{85, 6}_1
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨  p_425 ∨ -b^{85, 6}_0
c  in DIMACS:
-18785  18786 -18787  425  18788 0
-18785  18786 -18787  425  18789 0
-18785  18786 -18787  425 -18790 0

c  -2-1 --> break 
c    ( b^{85, 5}_2 ∧  b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧ -p_425) -> break
c  in CNF:
c    -b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨  b^{85, 5}_0 ∨  p_425 ∨ break
c  in DIMACS:
-18785 -18786  18787  425 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 5}_2 ∧ -b^{85, 5}_1 ∧ -b^{85, 5}_0 ∧ true) 
c  in CNF:
c    -b^{85, 5}_2 ∨  b^{85, 5}_1 ∨  b^{85, 5}_0 ∨ false 
c  in DIMACS:
-18785  18786  18787  0

c  3 does not represent an automaton state.
c    -(-b^{85, 5}_2 ∧  b^{85, 5}_1 ∧  b^{85, 5}_0 ∧ true) 
c  in CNF:
c     b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ false 
c  in DIMACS:
 18785 -18786 -18787  0
c  -3 does not represent an automaton state.
c    -( b^{85, 5}_2 ∧  b^{85, 5}_1 ∧  b^{85, 5}_0 ∧ true) 
c  in CNF:
c    -b^{85, 5}_2 ∨ -b^{85, 5}_1 ∨ -b^{85, 5}_0 ∨ false 
c  in DIMACS:
-18785 -18786 -18787  0

c i = 6
c  -2+1 --> -1
c    ( b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧  p_510) -> ( b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0)
c  in CNF:
c    -b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨  b^{85, 7}_2
c    -b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_1
c    -b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨  b^{85, 7}_0
c  in DIMACS:
-18788 -18789  18790 -510  18791 0
-18788 -18789  18790 -510 -18792 0
-18788 -18789  18790 -510  18793 0

c  -1+1 --> 0
c    ( b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0 ∧  p_510) -> (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧ -b^{85, 7}_0)
c  in CNF:
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_2
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_1
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_0
c  in DIMACS:
-18788  18789 -18790 -510 -18791 0
-18788  18789 -18790 -510 -18792 0
-18788  18789 -18790 -510 -18793 0

c  0+1 --> 1
c    (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧  p_510) -> (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0)
c  in CNF:
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_2
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_1
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨  b^{85, 7}_0
c  in DIMACS:
 18788  18789  18790 -510 -18791 0
 18788  18789  18790 -510 -18792 0
 18788  18789  18790 -510  18793 0

c  1+1 --> 2
c    (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0 ∧  p_510) -> (-b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0)
c  in CNF:
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_2
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨  b^{85, 7}_1
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ -p_510 ∨ -b^{85, 7}_0
c  in DIMACS:
 18788  18789 -18790 -510 -18791 0
 18788  18789 -18790 -510  18792 0
 18788  18789 -18790 -510 -18793 0

c  2+1 --> break 
c    (-b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧  p_510) -> break
c  in CNF:
c     b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 18788 -18789  18790 -510 1162 0


c  2-1 --> 1
c    (-b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧ -p_510) -> (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0)
c  in CNF:
c     b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_2
c     b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_1
c     b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨  b^{85, 7}_0
c  in DIMACS:
 18788 -18789  18790  510 -18791 0
 18788 -18789  18790  510 -18792 0
 18788 -18789  18790  510  18793 0

c  1-1 --> 0
c    (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0 ∧ -p_510) -> (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧ -b^{85, 7}_0)
c  in CNF:
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_2
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_1
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_0
c  in DIMACS:
 18788  18789 -18790  510 -18791 0
 18788  18789 -18790  510 -18792 0
 18788  18789 -18790  510 -18793 0

c  0-1 --> -1
c    (-b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧ -p_510) -> ( b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0)
c  in CNF:
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨  b^{85, 7}_2
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_1
c     b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨  b^{85, 7}_0
c  in DIMACS:
 18788  18789  18790  510  18791 0
 18788  18789  18790  510 -18792 0
 18788  18789  18790  510  18793 0

c  -1-1 --> -2
c    ( b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧  b^{85, 6}_0 ∧ -p_510) -> ( b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0)
c  in CNF:
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨  b^{85, 7}_2
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨  b^{85, 7}_1
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨  p_510 ∨ -b^{85, 7}_0
c  in DIMACS:
-18788  18789 -18790  510  18791 0
-18788  18789 -18790  510  18792 0
-18788  18789 -18790  510 -18793 0

c  -2-1 --> break 
c    ( b^{85, 6}_2 ∧  b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨  b^{85, 6}_0 ∨  p_510 ∨ break
c  in DIMACS:
-18788 -18789  18790  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 6}_2 ∧ -b^{85, 6}_1 ∧ -b^{85, 6}_0 ∧ true) 
c  in CNF:
c    -b^{85, 6}_2 ∨  b^{85, 6}_1 ∨  b^{85, 6}_0 ∨ false 
c  in DIMACS:
-18788  18789  18790  0

c  3 does not represent an automaton state.
c    -(-b^{85, 6}_2 ∧  b^{85, 6}_1 ∧  b^{85, 6}_0 ∧ true) 
c  in CNF:
c     b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ false 
c  in DIMACS:
 18788 -18789 -18790  0
c  -3 does not represent an automaton state.
c    -( b^{85, 6}_2 ∧  b^{85, 6}_1 ∧  b^{85, 6}_0 ∧ true) 
c  in CNF:
c    -b^{85, 6}_2 ∨ -b^{85, 6}_1 ∨ -b^{85, 6}_0 ∨ false 
c  in DIMACS:
-18788 -18789 -18790  0

c i = 7
c  -2+1 --> -1
c    ( b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧  p_595) -> ( b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0)
c  in CNF:
c    -b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨  b^{85, 8}_2
c    -b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_1
c    -b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨  b^{85, 8}_0
c  in DIMACS:
-18791 -18792  18793 -595  18794 0
-18791 -18792  18793 -595 -18795 0
-18791 -18792  18793 -595  18796 0

c  -1+1 --> 0
c    ( b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0 ∧  p_595) -> (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧ -b^{85, 8}_0)
c  in CNF:
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_2
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_1
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_0
c  in DIMACS:
-18791  18792 -18793 -595 -18794 0
-18791  18792 -18793 -595 -18795 0
-18791  18792 -18793 -595 -18796 0

c  0+1 --> 1
c    (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧  p_595) -> (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0)
c  in CNF:
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_2
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_1
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨  b^{85, 8}_0
c  in DIMACS:
 18791  18792  18793 -595 -18794 0
 18791  18792  18793 -595 -18795 0
 18791  18792  18793 -595  18796 0

c  1+1 --> 2
c    (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0 ∧  p_595) -> (-b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0)
c  in CNF:
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_2
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨  b^{85, 8}_1
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ -p_595 ∨ -b^{85, 8}_0
c  in DIMACS:
 18791  18792 -18793 -595 -18794 0
 18791  18792 -18793 -595  18795 0
 18791  18792 -18793 -595 -18796 0

c  2+1 --> break 
c    (-b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧  p_595) -> break
c  in CNF:
c     b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 18791 -18792  18793 -595 1162 0


c  2-1 --> 1
c    (-b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧ -p_595) -> (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0)
c  in CNF:
c     b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_2
c     b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_1
c     b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨  b^{85, 8}_0
c  in DIMACS:
 18791 -18792  18793  595 -18794 0
 18791 -18792  18793  595 -18795 0
 18791 -18792  18793  595  18796 0

c  1-1 --> 0
c    (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0 ∧ -p_595) -> (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧ -b^{85, 8}_0)
c  in CNF:
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_2
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_1
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_0
c  in DIMACS:
 18791  18792 -18793  595 -18794 0
 18791  18792 -18793  595 -18795 0
 18791  18792 -18793  595 -18796 0

c  0-1 --> -1
c    (-b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧ -p_595) -> ( b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0)
c  in CNF:
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨  b^{85, 8}_2
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_1
c     b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨  b^{85, 8}_0
c  in DIMACS:
 18791  18792  18793  595  18794 0
 18791  18792  18793  595 -18795 0
 18791  18792  18793  595  18796 0

c  -1-1 --> -2
c    ( b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧  b^{85, 7}_0 ∧ -p_595) -> ( b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0)
c  in CNF:
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨  b^{85, 8}_2
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨  b^{85, 8}_1
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨  p_595 ∨ -b^{85, 8}_0
c  in DIMACS:
-18791  18792 -18793  595  18794 0
-18791  18792 -18793  595  18795 0
-18791  18792 -18793  595 -18796 0

c  -2-1 --> break 
c    ( b^{85, 7}_2 ∧  b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨  b^{85, 7}_0 ∨  p_595 ∨ break
c  in DIMACS:
-18791 -18792  18793  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 7}_2 ∧ -b^{85, 7}_1 ∧ -b^{85, 7}_0 ∧ true) 
c  in CNF:
c    -b^{85, 7}_2 ∨  b^{85, 7}_1 ∨  b^{85, 7}_0 ∨ false 
c  in DIMACS:
-18791  18792  18793  0

c  3 does not represent an automaton state.
c    -(-b^{85, 7}_2 ∧  b^{85, 7}_1 ∧  b^{85, 7}_0 ∧ true) 
c  in CNF:
c     b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ false 
c  in DIMACS:
 18791 -18792 -18793  0
c  -3 does not represent an automaton state.
c    -( b^{85, 7}_2 ∧  b^{85, 7}_1 ∧  b^{85, 7}_0 ∧ true) 
c  in CNF:
c    -b^{85, 7}_2 ∨ -b^{85, 7}_1 ∨ -b^{85, 7}_0 ∨ false 
c  in DIMACS:
-18791 -18792 -18793  0

c i = 8
c  -2+1 --> -1
c    ( b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧  p_680) -> ( b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0)
c  in CNF:
c    -b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨  b^{85, 9}_2
c    -b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_1
c    -b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨  b^{85, 9}_0
c  in DIMACS:
-18794 -18795  18796 -680  18797 0
-18794 -18795  18796 -680 -18798 0
-18794 -18795  18796 -680  18799 0

c  -1+1 --> 0
c    ( b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0 ∧  p_680) -> (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧ -b^{85, 9}_0)
c  in CNF:
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_2
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_1
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_0
c  in DIMACS:
-18794  18795 -18796 -680 -18797 0
-18794  18795 -18796 -680 -18798 0
-18794  18795 -18796 -680 -18799 0

c  0+1 --> 1
c    (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧  p_680) -> (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0)
c  in CNF:
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_2
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_1
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨  b^{85, 9}_0
c  in DIMACS:
 18794  18795  18796 -680 -18797 0
 18794  18795  18796 -680 -18798 0
 18794  18795  18796 -680  18799 0

c  1+1 --> 2
c    (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0 ∧  p_680) -> (-b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0)
c  in CNF:
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_2
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨  b^{85, 9}_1
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ -p_680 ∨ -b^{85, 9}_0
c  in DIMACS:
 18794  18795 -18796 -680 -18797 0
 18794  18795 -18796 -680  18798 0
 18794  18795 -18796 -680 -18799 0

c  2+1 --> break 
c    (-b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧  p_680) -> break
c  in CNF:
c     b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 18794 -18795  18796 -680 1162 0


c  2-1 --> 1
c    (-b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧ -p_680) -> (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0)
c  in CNF:
c     b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_2
c     b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_1
c     b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨  b^{85, 9}_0
c  in DIMACS:
 18794 -18795  18796  680 -18797 0
 18794 -18795  18796  680 -18798 0
 18794 -18795  18796  680  18799 0

c  1-1 --> 0
c    (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0 ∧ -p_680) -> (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧ -b^{85, 9}_0)
c  in CNF:
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_2
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_1
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_0
c  in DIMACS:
 18794  18795 -18796  680 -18797 0
 18794  18795 -18796  680 -18798 0
 18794  18795 -18796  680 -18799 0

c  0-1 --> -1
c    (-b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧ -p_680) -> ( b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0)
c  in CNF:
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨  b^{85, 9}_2
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_1
c     b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨  b^{85, 9}_0
c  in DIMACS:
 18794  18795  18796  680  18797 0
 18794  18795  18796  680 -18798 0
 18794  18795  18796  680  18799 0

c  -1-1 --> -2
c    ( b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧  b^{85, 8}_0 ∧ -p_680) -> ( b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0)
c  in CNF:
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨  b^{85, 9}_2
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨  b^{85, 9}_1
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨  p_680 ∨ -b^{85, 9}_0
c  in DIMACS:
-18794  18795 -18796  680  18797 0
-18794  18795 -18796  680  18798 0
-18794  18795 -18796  680 -18799 0

c  -2-1 --> break 
c    ( b^{85, 8}_2 ∧  b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨  b^{85, 8}_0 ∨  p_680 ∨ break
c  in DIMACS:
-18794 -18795  18796  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 8}_2 ∧ -b^{85, 8}_1 ∧ -b^{85, 8}_0 ∧ true) 
c  in CNF:
c    -b^{85, 8}_2 ∨  b^{85, 8}_1 ∨  b^{85, 8}_0 ∨ false 
c  in DIMACS:
-18794  18795  18796  0

c  3 does not represent an automaton state.
c    -(-b^{85, 8}_2 ∧  b^{85, 8}_1 ∧  b^{85, 8}_0 ∧ true) 
c  in CNF:
c     b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ false 
c  in DIMACS:
 18794 -18795 -18796  0
c  -3 does not represent an automaton state.
c    -( b^{85, 8}_2 ∧  b^{85, 8}_1 ∧  b^{85, 8}_0 ∧ true) 
c  in CNF:
c    -b^{85, 8}_2 ∨ -b^{85, 8}_1 ∨ -b^{85, 8}_0 ∨ false 
c  in DIMACS:
-18794 -18795 -18796  0

c i = 9
c  -2+1 --> -1
c    ( b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧  p_765) -> ( b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0)
c  in CNF:
c    -b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨  b^{85, 10}_2
c    -b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_1
c    -b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨  b^{85, 10}_0
c  in DIMACS:
-18797 -18798  18799 -765  18800 0
-18797 -18798  18799 -765 -18801 0
-18797 -18798  18799 -765  18802 0

c  -1+1 --> 0
c    ( b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0 ∧  p_765) -> (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧ -b^{85, 10}_0)
c  in CNF:
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_2
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_1
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_0
c  in DIMACS:
-18797  18798 -18799 -765 -18800 0
-18797  18798 -18799 -765 -18801 0
-18797  18798 -18799 -765 -18802 0

c  0+1 --> 1
c    (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧  p_765) -> (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0)
c  in CNF:
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_2
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_1
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨  b^{85, 10}_0
c  in DIMACS:
 18797  18798  18799 -765 -18800 0
 18797  18798  18799 -765 -18801 0
 18797  18798  18799 -765  18802 0

c  1+1 --> 2
c    (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0 ∧  p_765) -> (-b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0)
c  in CNF:
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_2
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨  b^{85, 10}_1
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ -p_765 ∨ -b^{85, 10}_0
c  in DIMACS:
 18797  18798 -18799 -765 -18800 0
 18797  18798 -18799 -765  18801 0
 18797  18798 -18799 -765 -18802 0

c  2+1 --> break 
c    (-b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧  p_765) -> break
c  in CNF:
c     b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 18797 -18798  18799 -765 1162 0


c  2-1 --> 1
c    (-b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧ -p_765) -> (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0)
c  in CNF:
c     b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_2
c     b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_1
c     b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨  b^{85, 10}_0
c  in DIMACS:
 18797 -18798  18799  765 -18800 0
 18797 -18798  18799  765 -18801 0
 18797 -18798  18799  765  18802 0

c  1-1 --> 0
c    (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0 ∧ -p_765) -> (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧ -b^{85, 10}_0)
c  in CNF:
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_2
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_1
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_0
c  in DIMACS:
 18797  18798 -18799  765 -18800 0
 18797  18798 -18799  765 -18801 0
 18797  18798 -18799  765 -18802 0

c  0-1 --> -1
c    (-b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧ -p_765) -> ( b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0)
c  in CNF:
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨  b^{85, 10}_2
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_1
c     b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨  b^{85, 10}_0
c  in DIMACS:
 18797  18798  18799  765  18800 0
 18797  18798  18799  765 -18801 0
 18797  18798  18799  765  18802 0

c  -1-1 --> -2
c    ( b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧  b^{85, 9}_0 ∧ -p_765) -> ( b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0)
c  in CNF:
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨  b^{85, 10}_2
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨  b^{85, 10}_1
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨  p_765 ∨ -b^{85, 10}_0
c  in DIMACS:
-18797  18798 -18799  765  18800 0
-18797  18798 -18799  765  18801 0
-18797  18798 -18799  765 -18802 0

c  -2-1 --> break 
c    ( b^{85, 9}_2 ∧  b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨  b^{85, 9}_0 ∨  p_765 ∨ break
c  in DIMACS:
-18797 -18798  18799  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 9}_2 ∧ -b^{85, 9}_1 ∧ -b^{85, 9}_0 ∧ true) 
c  in CNF:
c    -b^{85, 9}_2 ∨  b^{85, 9}_1 ∨  b^{85, 9}_0 ∨ false 
c  in DIMACS:
-18797  18798  18799  0

c  3 does not represent an automaton state.
c    -(-b^{85, 9}_2 ∧  b^{85, 9}_1 ∧  b^{85, 9}_0 ∧ true) 
c  in CNF:
c     b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ false 
c  in DIMACS:
 18797 -18798 -18799  0
c  -3 does not represent an automaton state.
c    -( b^{85, 9}_2 ∧  b^{85, 9}_1 ∧  b^{85, 9}_0 ∧ true) 
c  in CNF:
c    -b^{85, 9}_2 ∨ -b^{85, 9}_1 ∨ -b^{85, 9}_0 ∨ false 
c  in DIMACS:
-18797 -18798 -18799  0

c i = 10
c  -2+1 --> -1
c    ( b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧  p_850) -> ( b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0)
c  in CNF:
c    -b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨  b^{85, 11}_2
c    -b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_1
c    -b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨  b^{85, 11}_0
c  in DIMACS:
-18800 -18801  18802 -850  18803 0
-18800 -18801  18802 -850 -18804 0
-18800 -18801  18802 -850  18805 0

c  -1+1 --> 0
c    ( b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0 ∧  p_850) -> (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧ -b^{85, 11}_0)
c  in CNF:
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_2
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_1
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_0
c  in DIMACS:
-18800  18801 -18802 -850 -18803 0
-18800  18801 -18802 -850 -18804 0
-18800  18801 -18802 -850 -18805 0

c  0+1 --> 1
c    (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧  p_850) -> (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0)
c  in CNF:
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_2
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_1
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨  b^{85, 11}_0
c  in DIMACS:
 18800  18801  18802 -850 -18803 0
 18800  18801  18802 -850 -18804 0
 18800  18801  18802 -850  18805 0

c  1+1 --> 2
c    (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0 ∧  p_850) -> (-b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0)
c  in CNF:
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_2
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨  b^{85, 11}_1
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ -p_850 ∨ -b^{85, 11}_0
c  in DIMACS:
 18800  18801 -18802 -850 -18803 0
 18800  18801 -18802 -850  18804 0
 18800  18801 -18802 -850 -18805 0

c  2+1 --> break 
c    (-b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧  p_850) -> break
c  in CNF:
c     b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 18800 -18801  18802 -850 1162 0


c  2-1 --> 1
c    (-b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧ -p_850) -> (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0)
c  in CNF:
c     b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_2
c     b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_1
c     b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨  b^{85, 11}_0
c  in DIMACS:
 18800 -18801  18802  850 -18803 0
 18800 -18801  18802  850 -18804 0
 18800 -18801  18802  850  18805 0

c  1-1 --> 0
c    (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0 ∧ -p_850) -> (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧ -b^{85, 11}_0)
c  in CNF:
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_2
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_1
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_0
c  in DIMACS:
 18800  18801 -18802  850 -18803 0
 18800  18801 -18802  850 -18804 0
 18800  18801 -18802  850 -18805 0

c  0-1 --> -1
c    (-b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧ -p_850) -> ( b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0)
c  in CNF:
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨  b^{85, 11}_2
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_1
c     b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨  b^{85, 11}_0
c  in DIMACS:
 18800  18801  18802  850  18803 0
 18800  18801  18802  850 -18804 0
 18800  18801  18802  850  18805 0

c  -1-1 --> -2
c    ( b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧  b^{85, 10}_0 ∧ -p_850) -> ( b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0)
c  in CNF:
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨  b^{85, 11}_2
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨  b^{85, 11}_1
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨  p_850 ∨ -b^{85, 11}_0
c  in DIMACS:
-18800  18801 -18802  850  18803 0
-18800  18801 -18802  850  18804 0
-18800  18801 -18802  850 -18805 0

c  -2-1 --> break 
c    ( b^{85, 10}_2 ∧  b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨  b^{85, 10}_0 ∨  p_850 ∨ break
c  in DIMACS:
-18800 -18801  18802  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 10}_2 ∧ -b^{85, 10}_1 ∧ -b^{85, 10}_0 ∧ true) 
c  in CNF:
c    -b^{85, 10}_2 ∨  b^{85, 10}_1 ∨  b^{85, 10}_0 ∨ false 
c  in DIMACS:
-18800  18801  18802  0

c  3 does not represent an automaton state.
c    -(-b^{85, 10}_2 ∧  b^{85, 10}_1 ∧  b^{85, 10}_0 ∧ true) 
c  in CNF:
c     b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ false 
c  in DIMACS:
 18800 -18801 -18802  0
c  -3 does not represent an automaton state.
c    -( b^{85, 10}_2 ∧  b^{85, 10}_1 ∧  b^{85, 10}_0 ∧ true) 
c  in CNF:
c    -b^{85, 10}_2 ∨ -b^{85, 10}_1 ∨ -b^{85, 10}_0 ∨ false 
c  in DIMACS:
-18800 -18801 -18802  0

c i = 11
c  -2+1 --> -1
c    ( b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧  p_935) -> ( b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0)
c  in CNF:
c    -b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨  b^{85, 12}_2
c    -b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_1
c    -b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨  b^{85, 12}_0
c  in DIMACS:
-18803 -18804  18805 -935  18806 0
-18803 -18804  18805 -935 -18807 0
-18803 -18804  18805 -935  18808 0

c  -1+1 --> 0
c    ( b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0 ∧  p_935) -> (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧ -b^{85, 12}_0)
c  in CNF:
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_2
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_1
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_0
c  in DIMACS:
-18803  18804 -18805 -935 -18806 0
-18803  18804 -18805 -935 -18807 0
-18803  18804 -18805 -935 -18808 0

c  0+1 --> 1
c    (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧  p_935) -> (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0)
c  in CNF:
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_2
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_1
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨  b^{85, 12}_0
c  in DIMACS:
 18803  18804  18805 -935 -18806 0
 18803  18804  18805 -935 -18807 0
 18803  18804  18805 -935  18808 0

c  1+1 --> 2
c    (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0 ∧  p_935) -> (-b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0)
c  in CNF:
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_2
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨  b^{85, 12}_1
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ -p_935 ∨ -b^{85, 12}_0
c  in DIMACS:
 18803  18804 -18805 -935 -18806 0
 18803  18804 -18805 -935  18807 0
 18803  18804 -18805 -935 -18808 0

c  2+1 --> break 
c    (-b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧  p_935) -> break
c  in CNF:
c     b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 18803 -18804  18805 -935 1162 0


c  2-1 --> 1
c    (-b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧ -p_935) -> (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0)
c  in CNF:
c     b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_2
c     b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_1
c     b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨  b^{85, 12}_0
c  in DIMACS:
 18803 -18804  18805  935 -18806 0
 18803 -18804  18805  935 -18807 0
 18803 -18804  18805  935  18808 0

c  1-1 --> 0
c    (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0 ∧ -p_935) -> (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧ -b^{85, 12}_0)
c  in CNF:
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_2
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_1
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_0
c  in DIMACS:
 18803  18804 -18805  935 -18806 0
 18803  18804 -18805  935 -18807 0
 18803  18804 -18805  935 -18808 0

c  0-1 --> -1
c    (-b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧ -p_935) -> ( b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0)
c  in CNF:
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨  b^{85, 12}_2
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_1
c     b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨  b^{85, 12}_0
c  in DIMACS:
 18803  18804  18805  935  18806 0
 18803  18804  18805  935 -18807 0
 18803  18804  18805  935  18808 0

c  -1-1 --> -2
c    ( b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧  b^{85, 11}_0 ∧ -p_935) -> ( b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0)
c  in CNF:
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨  b^{85, 12}_2
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨  b^{85, 12}_1
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨  p_935 ∨ -b^{85, 12}_0
c  in DIMACS:
-18803  18804 -18805  935  18806 0
-18803  18804 -18805  935  18807 0
-18803  18804 -18805  935 -18808 0

c  -2-1 --> break 
c    ( b^{85, 11}_2 ∧  b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨  b^{85, 11}_0 ∨  p_935 ∨ break
c  in DIMACS:
-18803 -18804  18805  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 11}_2 ∧ -b^{85, 11}_1 ∧ -b^{85, 11}_0 ∧ true) 
c  in CNF:
c    -b^{85, 11}_2 ∨  b^{85, 11}_1 ∨  b^{85, 11}_0 ∨ false 
c  in DIMACS:
-18803  18804  18805  0

c  3 does not represent an automaton state.
c    -(-b^{85, 11}_2 ∧  b^{85, 11}_1 ∧  b^{85, 11}_0 ∧ true) 
c  in CNF:
c     b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ false 
c  in DIMACS:
 18803 -18804 -18805  0
c  -3 does not represent an automaton state.
c    -( b^{85, 11}_2 ∧  b^{85, 11}_1 ∧  b^{85, 11}_0 ∧ true) 
c  in CNF:
c    -b^{85, 11}_2 ∨ -b^{85, 11}_1 ∨ -b^{85, 11}_0 ∨ false 
c  in DIMACS:
-18803 -18804 -18805  0

c i = 12
c  -2+1 --> -1
c    ( b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧  p_1020) -> ( b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0)
c  in CNF:
c    -b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨  b^{85, 13}_2
c    -b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_1
c    -b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨  b^{85, 13}_0
c  in DIMACS:
-18806 -18807  18808 -1020  18809 0
-18806 -18807  18808 -1020 -18810 0
-18806 -18807  18808 -1020  18811 0

c  -1+1 --> 0
c    ( b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0 ∧  p_1020) -> (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧ -b^{85, 13}_0)
c  in CNF:
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_2
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_1
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_0
c  in DIMACS:
-18806  18807 -18808 -1020 -18809 0
-18806  18807 -18808 -1020 -18810 0
-18806  18807 -18808 -1020 -18811 0

c  0+1 --> 1
c    (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧  p_1020) -> (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0)
c  in CNF:
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_2
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_1
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨  b^{85, 13}_0
c  in DIMACS:
 18806  18807  18808 -1020 -18809 0
 18806  18807  18808 -1020 -18810 0
 18806  18807  18808 -1020  18811 0

c  1+1 --> 2
c    (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0 ∧  p_1020) -> (-b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0)
c  in CNF:
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_2
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨  b^{85, 13}_1
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ -p_1020 ∨ -b^{85, 13}_0
c  in DIMACS:
 18806  18807 -18808 -1020 -18809 0
 18806  18807 -18808 -1020  18810 0
 18806  18807 -18808 -1020 -18811 0

c  2+1 --> break 
c    (-b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 18806 -18807  18808 -1020 1162 0


c  2-1 --> 1
c    (-b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧ -p_1020) -> (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0)
c  in CNF:
c     b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_2
c     b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_1
c     b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨  b^{85, 13}_0
c  in DIMACS:
 18806 -18807  18808  1020 -18809 0
 18806 -18807  18808  1020 -18810 0
 18806 -18807  18808  1020  18811 0

c  1-1 --> 0
c    (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0 ∧ -p_1020) -> (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧ -b^{85, 13}_0)
c  in CNF:
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_2
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_1
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_0
c  in DIMACS:
 18806  18807 -18808  1020 -18809 0
 18806  18807 -18808  1020 -18810 0
 18806  18807 -18808  1020 -18811 0

c  0-1 --> -1
c    (-b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧ -p_1020) -> ( b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0)
c  in CNF:
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨  b^{85, 13}_2
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_1
c     b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨  b^{85, 13}_0
c  in DIMACS:
 18806  18807  18808  1020  18809 0
 18806  18807  18808  1020 -18810 0
 18806  18807  18808  1020  18811 0

c  -1-1 --> -2
c    ( b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧  b^{85, 12}_0 ∧ -p_1020) -> ( b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0)
c  in CNF:
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨  b^{85, 13}_2
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨  b^{85, 13}_1
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨  p_1020 ∨ -b^{85, 13}_0
c  in DIMACS:
-18806  18807 -18808  1020  18809 0
-18806  18807 -18808  1020  18810 0
-18806  18807 -18808  1020 -18811 0

c  -2-1 --> break 
c    ( b^{85, 12}_2 ∧  b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨  b^{85, 12}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-18806 -18807  18808  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 12}_2 ∧ -b^{85, 12}_1 ∧ -b^{85, 12}_0 ∧ true) 
c  in CNF:
c    -b^{85, 12}_2 ∨  b^{85, 12}_1 ∨  b^{85, 12}_0 ∨ false 
c  in DIMACS:
-18806  18807  18808  0

c  3 does not represent an automaton state.
c    -(-b^{85, 12}_2 ∧  b^{85, 12}_1 ∧  b^{85, 12}_0 ∧ true) 
c  in CNF:
c     b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ false 
c  in DIMACS:
 18806 -18807 -18808  0
c  -3 does not represent an automaton state.
c    -( b^{85, 12}_2 ∧  b^{85, 12}_1 ∧  b^{85, 12}_0 ∧ true) 
c  in CNF:
c    -b^{85, 12}_2 ∨ -b^{85, 12}_1 ∨ -b^{85, 12}_0 ∨ false 
c  in DIMACS:
-18806 -18807 -18808  0

c i = 13
c  -2+1 --> -1
c    ( b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧  p_1105) -> ( b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧  b^{85, 14}_0)
c  in CNF:
c    -b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨  b^{85, 14}_2
c    -b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_1
c    -b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨  b^{85, 14}_0
c  in DIMACS:
-18809 -18810  18811 -1105  18812 0
-18809 -18810  18811 -1105 -18813 0
-18809 -18810  18811 -1105  18814 0

c  -1+1 --> 0
c    ( b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0 ∧  p_1105) -> (-b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧ -b^{85, 14}_0)
c  in CNF:
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_2
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_1
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_0
c  in DIMACS:
-18809  18810 -18811 -1105 -18812 0
-18809  18810 -18811 -1105 -18813 0
-18809  18810 -18811 -1105 -18814 0

c  0+1 --> 1
c    (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧  p_1105) -> (-b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧  b^{85, 14}_0)
c  in CNF:
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_2
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_1
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨  b^{85, 14}_0
c  in DIMACS:
 18809  18810  18811 -1105 -18812 0
 18809  18810  18811 -1105 -18813 0
 18809  18810  18811 -1105  18814 0

c  1+1 --> 2
c    (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0 ∧  p_1105) -> (-b^{85, 14}_2 ∧  b^{85, 14}_1 ∧ -b^{85, 14}_0)
c  in CNF:
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_2
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨  b^{85, 14}_1
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ -p_1105 ∨ -b^{85, 14}_0
c  in DIMACS:
 18809  18810 -18811 -1105 -18812 0
 18809  18810 -18811 -1105  18813 0
 18809  18810 -18811 -1105 -18814 0

c  2+1 --> break 
c    (-b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 18809 -18810  18811 -1105 1162 0


c  2-1 --> 1
c    (-b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧ -p_1105) -> (-b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧  b^{85, 14}_0)
c  in CNF:
c     b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_2
c     b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_1
c     b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨  b^{85, 14}_0
c  in DIMACS:
 18809 -18810  18811  1105 -18812 0
 18809 -18810  18811  1105 -18813 0
 18809 -18810  18811  1105  18814 0

c  1-1 --> 0
c    (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0 ∧ -p_1105) -> (-b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧ -b^{85, 14}_0)
c  in CNF:
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_2
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_1
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_0
c  in DIMACS:
 18809  18810 -18811  1105 -18812 0
 18809  18810 -18811  1105 -18813 0
 18809  18810 -18811  1105 -18814 0

c  0-1 --> -1
c    (-b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧ -p_1105) -> ( b^{85, 14}_2 ∧ -b^{85, 14}_1 ∧  b^{85, 14}_0)
c  in CNF:
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨  b^{85, 14}_2
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_1
c     b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨  b^{85, 14}_0
c  in DIMACS:
 18809  18810  18811  1105  18812 0
 18809  18810  18811  1105 -18813 0
 18809  18810  18811  1105  18814 0

c  -1-1 --> -2
c    ( b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧  b^{85, 13}_0 ∧ -p_1105) -> ( b^{85, 14}_2 ∧  b^{85, 14}_1 ∧ -b^{85, 14}_0)
c  in CNF:
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨  b^{85, 14}_2
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨  b^{85, 14}_1
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨  p_1105 ∨ -b^{85, 14}_0
c  in DIMACS:
-18809  18810 -18811  1105  18812 0
-18809  18810 -18811  1105  18813 0
-18809  18810 -18811  1105 -18814 0

c  -2-1 --> break 
c    ( b^{85, 13}_2 ∧  b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨  b^{85, 13}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-18809 -18810  18811  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{85, 13}_2 ∧ -b^{85, 13}_1 ∧ -b^{85, 13}_0 ∧ true) 
c  in CNF:
c    -b^{85, 13}_2 ∨  b^{85, 13}_1 ∨  b^{85, 13}_0 ∨ false 
c  in DIMACS:
-18809  18810  18811  0

c  3 does not represent an automaton state.
c    -(-b^{85, 13}_2 ∧  b^{85, 13}_1 ∧  b^{85, 13}_0 ∧ true) 
c  in CNF:
c     b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ false 
c  in DIMACS:
 18809 -18810 -18811  0
c  -3 does not represent an automaton state.
c    -( b^{85, 13}_2 ∧  b^{85, 13}_1 ∧  b^{85, 13}_0 ∧ true) 
c  in CNF:
c    -b^{85, 13}_2 ∨ -b^{85, 13}_1 ∨ -b^{85, 13}_0 ∨ false 
c  in DIMACS:
-18809 -18810 -18811  0

c INIT for k = 86
c    -b^{86, 1}_2
c    -b^{86, 1}_1
c    -b^{86, 1}_0
c  in DIMACS:
-18815 0
-18816 0
-18817 0

c Transitions for k = 86
c i = 1
c  -2+1 --> -1
c    ( b^{86, 1}_2 ∧  b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧  p_86) -> ( b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0)
c  in CNF:
c    -b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨  b^{86, 2}_2
c    -b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_1
c    -b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨  b^{86, 2}_0
c  in DIMACS:
-18815 -18816  18817 -86  18818 0
-18815 -18816  18817 -86 -18819 0
-18815 -18816  18817 -86  18820 0

c  -1+1 --> 0
c    ( b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧  b^{86, 1}_0 ∧  p_86) -> (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧ -b^{86, 2}_0)
c  in CNF:
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_2
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_1
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_0
c  in DIMACS:
-18815  18816 -18817 -86 -18818 0
-18815  18816 -18817 -86 -18819 0
-18815  18816 -18817 -86 -18820 0

c  0+1 --> 1
c    (-b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧  p_86) -> (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0)
c  in CNF:
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_2
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_1
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨  b^{86, 2}_0
c  in DIMACS:
 18815  18816  18817 -86 -18818 0
 18815  18816  18817 -86 -18819 0
 18815  18816  18817 -86  18820 0

c  1+1 --> 2
c    (-b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧  b^{86, 1}_0 ∧  p_86) -> (-b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0)
c  in CNF:
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_2
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨  b^{86, 2}_1
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ -p_86 ∨ -b^{86, 2}_0
c  in DIMACS:
 18815  18816 -18817 -86 -18818 0
 18815  18816 -18817 -86  18819 0
 18815  18816 -18817 -86 -18820 0

c  2+1 --> break 
c    (-b^{86, 1}_2 ∧  b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧  p_86) -> break
c  in CNF:
c     b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ -p_86 ∨ break
c  in DIMACS:
 18815 -18816  18817 -86 1162 0


c  2-1 --> 1
c    (-b^{86, 1}_2 ∧  b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧ -p_86) -> (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0)
c  in CNF:
c     b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_2
c     b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_1
c     b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨  b^{86, 2}_0
c  in DIMACS:
 18815 -18816  18817  86 -18818 0
 18815 -18816  18817  86 -18819 0
 18815 -18816  18817  86  18820 0

c  1-1 --> 0
c    (-b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧  b^{86, 1}_0 ∧ -p_86) -> (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧ -b^{86, 2}_0)
c  in CNF:
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_2
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_1
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_0
c  in DIMACS:
 18815  18816 -18817  86 -18818 0
 18815  18816 -18817  86 -18819 0
 18815  18816 -18817  86 -18820 0

c  0-1 --> -1
c    (-b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧ -p_86) -> ( b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0)
c  in CNF:
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨  b^{86, 2}_2
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_1
c     b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨  b^{86, 2}_0
c  in DIMACS:
 18815  18816  18817  86  18818 0
 18815  18816  18817  86 -18819 0
 18815  18816  18817  86  18820 0

c  -1-1 --> -2
c    ( b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧  b^{86, 1}_0 ∧ -p_86) -> ( b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0)
c  in CNF:
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨  b^{86, 2}_2
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨  b^{86, 2}_1
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨  p_86 ∨ -b^{86, 2}_0
c  in DIMACS:
-18815  18816 -18817  86  18818 0
-18815  18816 -18817  86  18819 0
-18815  18816 -18817  86 -18820 0

c  -2-1 --> break 
c    ( b^{86, 1}_2 ∧  b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧ -p_86) -> break
c  in CNF:
c    -b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨  b^{86, 1}_0 ∨  p_86 ∨ break
c  in DIMACS:
-18815 -18816  18817  86 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 1}_2 ∧ -b^{86, 1}_1 ∧ -b^{86, 1}_0 ∧ true) 
c  in CNF:
c    -b^{86, 1}_2 ∨  b^{86, 1}_1 ∨  b^{86, 1}_0 ∨ false 
c  in DIMACS:
-18815  18816  18817  0

c  3 does not represent an automaton state.
c    -(-b^{86, 1}_2 ∧  b^{86, 1}_1 ∧  b^{86, 1}_0 ∧ true) 
c  in CNF:
c     b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ false 
c  in DIMACS:
 18815 -18816 -18817  0
c  -3 does not represent an automaton state.
c    -( b^{86, 1}_2 ∧  b^{86, 1}_1 ∧  b^{86, 1}_0 ∧ true) 
c  in CNF:
c    -b^{86, 1}_2 ∨ -b^{86, 1}_1 ∨ -b^{86, 1}_0 ∨ false 
c  in DIMACS:
-18815 -18816 -18817  0

c i = 2
c  -2+1 --> -1
c    ( b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧  p_172) -> ( b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0)
c  in CNF:
c    -b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨  b^{86, 3}_2
c    -b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_1
c    -b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨  b^{86, 3}_0
c  in DIMACS:
-18818 -18819  18820 -172  18821 0
-18818 -18819  18820 -172 -18822 0
-18818 -18819  18820 -172  18823 0

c  -1+1 --> 0
c    ( b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0 ∧  p_172) -> (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧ -b^{86, 3}_0)
c  in CNF:
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_2
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_1
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_0
c  in DIMACS:
-18818  18819 -18820 -172 -18821 0
-18818  18819 -18820 -172 -18822 0
-18818  18819 -18820 -172 -18823 0

c  0+1 --> 1
c    (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧  p_172) -> (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0)
c  in CNF:
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_2
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_1
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨  b^{86, 3}_0
c  in DIMACS:
 18818  18819  18820 -172 -18821 0
 18818  18819  18820 -172 -18822 0
 18818  18819  18820 -172  18823 0

c  1+1 --> 2
c    (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0 ∧  p_172) -> (-b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0)
c  in CNF:
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_2
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨  b^{86, 3}_1
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ -p_172 ∨ -b^{86, 3}_0
c  in DIMACS:
 18818  18819 -18820 -172 -18821 0
 18818  18819 -18820 -172  18822 0
 18818  18819 -18820 -172 -18823 0

c  2+1 --> break 
c    (-b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧  p_172) -> break
c  in CNF:
c     b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 18818 -18819  18820 -172 1162 0


c  2-1 --> 1
c    (-b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧ -p_172) -> (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0)
c  in CNF:
c     b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_2
c     b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_1
c     b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨  b^{86, 3}_0
c  in DIMACS:
 18818 -18819  18820  172 -18821 0
 18818 -18819  18820  172 -18822 0
 18818 -18819  18820  172  18823 0

c  1-1 --> 0
c    (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0 ∧ -p_172) -> (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧ -b^{86, 3}_0)
c  in CNF:
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_2
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_1
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_0
c  in DIMACS:
 18818  18819 -18820  172 -18821 0
 18818  18819 -18820  172 -18822 0
 18818  18819 -18820  172 -18823 0

c  0-1 --> -1
c    (-b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧ -p_172) -> ( b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0)
c  in CNF:
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨  b^{86, 3}_2
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_1
c     b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨  b^{86, 3}_0
c  in DIMACS:
 18818  18819  18820  172  18821 0
 18818  18819  18820  172 -18822 0
 18818  18819  18820  172  18823 0

c  -1-1 --> -2
c    ( b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧  b^{86, 2}_0 ∧ -p_172) -> ( b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0)
c  in CNF:
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨  b^{86, 3}_2
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨  b^{86, 3}_1
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨  p_172 ∨ -b^{86, 3}_0
c  in DIMACS:
-18818  18819 -18820  172  18821 0
-18818  18819 -18820  172  18822 0
-18818  18819 -18820  172 -18823 0

c  -2-1 --> break 
c    ( b^{86, 2}_2 ∧  b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨  b^{86, 2}_0 ∨  p_172 ∨ break
c  in DIMACS:
-18818 -18819  18820  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 2}_2 ∧ -b^{86, 2}_1 ∧ -b^{86, 2}_0 ∧ true) 
c  in CNF:
c    -b^{86, 2}_2 ∨  b^{86, 2}_1 ∨  b^{86, 2}_0 ∨ false 
c  in DIMACS:
-18818  18819  18820  0

c  3 does not represent an automaton state.
c    -(-b^{86, 2}_2 ∧  b^{86, 2}_1 ∧  b^{86, 2}_0 ∧ true) 
c  in CNF:
c     b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ false 
c  in DIMACS:
 18818 -18819 -18820  0
c  -3 does not represent an automaton state.
c    -( b^{86, 2}_2 ∧  b^{86, 2}_1 ∧  b^{86, 2}_0 ∧ true) 
c  in CNF:
c    -b^{86, 2}_2 ∨ -b^{86, 2}_1 ∨ -b^{86, 2}_0 ∨ false 
c  in DIMACS:
-18818 -18819 -18820  0

c i = 3
c  -2+1 --> -1
c    ( b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧  p_258) -> ( b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0)
c  in CNF:
c    -b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨  b^{86, 4}_2
c    -b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_1
c    -b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨  b^{86, 4}_0
c  in DIMACS:
-18821 -18822  18823 -258  18824 0
-18821 -18822  18823 -258 -18825 0
-18821 -18822  18823 -258  18826 0

c  -1+1 --> 0
c    ( b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0 ∧  p_258) -> (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧ -b^{86, 4}_0)
c  in CNF:
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_2
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_1
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_0
c  in DIMACS:
-18821  18822 -18823 -258 -18824 0
-18821  18822 -18823 -258 -18825 0
-18821  18822 -18823 -258 -18826 0

c  0+1 --> 1
c    (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧  p_258) -> (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0)
c  in CNF:
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_2
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_1
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨  b^{86, 4}_0
c  in DIMACS:
 18821  18822  18823 -258 -18824 0
 18821  18822  18823 -258 -18825 0
 18821  18822  18823 -258  18826 0

c  1+1 --> 2
c    (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0 ∧  p_258) -> (-b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0)
c  in CNF:
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_2
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨  b^{86, 4}_1
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ -p_258 ∨ -b^{86, 4}_0
c  in DIMACS:
 18821  18822 -18823 -258 -18824 0
 18821  18822 -18823 -258  18825 0
 18821  18822 -18823 -258 -18826 0

c  2+1 --> break 
c    (-b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧  p_258) -> break
c  in CNF:
c     b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 18821 -18822  18823 -258 1162 0


c  2-1 --> 1
c    (-b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧ -p_258) -> (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0)
c  in CNF:
c     b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_2
c     b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_1
c     b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨  b^{86, 4}_0
c  in DIMACS:
 18821 -18822  18823  258 -18824 0
 18821 -18822  18823  258 -18825 0
 18821 -18822  18823  258  18826 0

c  1-1 --> 0
c    (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0 ∧ -p_258) -> (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧ -b^{86, 4}_0)
c  in CNF:
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_2
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_1
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_0
c  in DIMACS:
 18821  18822 -18823  258 -18824 0
 18821  18822 -18823  258 -18825 0
 18821  18822 -18823  258 -18826 0

c  0-1 --> -1
c    (-b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧ -p_258) -> ( b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0)
c  in CNF:
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨  b^{86, 4}_2
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_1
c     b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨  b^{86, 4}_0
c  in DIMACS:
 18821  18822  18823  258  18824 0
 18821  18822  18823  258 -18825 0
 18821  18822  18823  258  18826 0

c  -1-1 --> -2
c    ( b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧  b^{86, 3}_0 ∧ -p_258) -> ( b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0)
c  in CNF:
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨  b^{86, 4}_2
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨  b^{86, 4}_1
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨  p_258 ∨ -b^{86, 4}_0
c  in DIMACS:
-18821  18822 -18823  258  18824 0
-18821  18822 -18823  258  18825 0
-18821  18822 -18823  258 -18826 0

c  -2-1 --> break 
c    ( b^{86, 3}_2 ∧  b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨  b^{86, 3}_0 ∨  p_258 ∨ break
c  in DIMACS:
-18821 -18822  18823  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 3}_2 ∧ -b^{86, 3}_1 ∧ -b^{86, 3}_0 ∧ true) 
c  in CNF:
c    -b^{86, 3}_2 ∨  b^{86, 3}_1 ∨  b^{86, 3}_0 ∨ false 
c  in DIMACS:
-18821  18822  18823  0

c  3 does not represent an automaton state.
c    -(-b^{86, 3}_2 ∧  b^{86, 3}_1 ∧  b^{86, 3}_0 ∧ true) 
c  in CNF:
c     b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ false 
c  in DIMACS:
 18821 -18822 -18823  0
c  -3 does not represent an automaton state.
c    -( b^{86, 3}_2 ∧  b^{86, 3}_1 ∧  b^{86, 3}_0 ∧ true) 
c  in CNF:
c    -b^{86, 3}_2 ∨ -b^{86, 3}_1 ∨ -b^{86, 3}_0 ∨ false 
c  in DIMACS:
-18821 -18822 -18823  0

c i = 4
c  -2+1 --> -1
c    ( b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧  p_344) -> ( b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0)
c  in CNF:
c    -b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨  b^{86, 5}_2
c    -b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_1
c    -b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨  b^{86, 5}_0
c  in DIMACS:
-18824 -18825  18826 -344  18827 0
-18824 -18825  18826 -344 -18828 0
-18824 -18825  18826 -344  18829 0

c  -1+1 --> 0
c    ( b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0 ∧  p_344) -> (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧ -b^{86, 5}_0)
c  in CNF:
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_2
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_1
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_0
c  in DIMACS:
-18824  18825 -18826 -344 -18827 0
-18824  18825 -18826 -344 -18828 0
-18824  18825 -18826 -344 -18829 0

c  0+1 --> 1
c    (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧  p_344) -> (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0)
c  in CNF:
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_2
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_1
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨  b^{86, 5}_0
c  in DIMACS:
 18824  18825  18826 -344 -18827 0
 18824  18825  18826 -344 -18828 0
 18824  18825  18826 -344  18829 0

c  1+1 --> 2
c    (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0 ∧  p_344) -> (-b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0)
c  in CNF:
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_2
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨  b^{86, 5}_1
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ -p_344 ∨ -b^{86, 5}_0
c  in DIMACS:
 18824  18825 -18826 -344 -18827 0
 18824  18825 -18826 -344  18828 0
 18824  18825 -18826 -344 -18829 0

c  2+1 --> break 
c    (-b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧  p_344) -> break
c  in CNF:
c     b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 18824 -18825  18826 -344 1162 0


c  2-1 --> 1
c    (-b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧ -p_344) -> (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0)
c  in CNF:
c     b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_2
c     b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_1
c     b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨  b^{86, 5}_0
c  in DIMACS:
 18824 -18825  18826  344 -18827 0
 18824 -18825  18826  344 -18828 0
 18824 -18825  18826  344  18829 0

c  1-1 --> 0
c    (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0 ∧ -p_344) -> (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧ -b^{86, 5}_0)
c  in CNF:
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_2
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_1
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_0
c  in DIMACS:
 18824  18825 -18826  344 -18827 0
 18824  18825 -18826  344 -18828 0
 18824  18825 -18826  344 -18829 0

c  0-1 --> -1
c    (-b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧ -p_344) -> ( b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0)
c  in CNF:
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨  b^{86, 5}_2
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_1
c     b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨  b^{86, 5}_0
c  in DIMACS:
 18824  18825  18826  344  18827 0
 18824  18825  18826  344 -18828 0
 18824  18825  18826  344  18829 0

c  -1-1 --> -2
c    ( b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧  b^{86, 4}_0 ∧ -p_344) -> ( b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0)
c  in CNF:
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨  b^{86, 5}_2
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨  b^{86, 5}_1
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨  p_344 ∨ -b^{86, 5}_0
c  in DIMACS:
-18824  18825 -18826  344  18827 0
-18824  18825 -18826  344  18828 0
-18824  18825 -18826  344 -18829 0

c  -2-1 --> break 
c    ( b^{86, 4}_2 ∧  b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨  b^{86, 4}_0 ∨  p_344 ∨ break
c  in DIMACS:
-18824 -18825  18826  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 4}_2 ∧ -b^{86, 4}_1 ∧ -b^{86, 4}_0 ∧ true) 
c  in CNF:
c    -b^{86, 4}_2 ∨  b^{86, 4}_1 ∨  b^{86, 4}_0 ∨ false 
c  in DIMACS:
-18824  18825  18826  0

c  3 does not represent an automaton state.
c    -(-b^{86, 4}_2 ∧  b^{86, 4}_1 ∧  b^{86, 4}_0 ∧ true) 
c  in CNF:
c     b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ false 
c  in DIMACS:
 18824 -18825 -18826  0
c  -3 does not represent an automaton state.
c    -( b^{86, 4}_2 ∧  b^{86, 4}_1 ∧  b^{86, 4}_0 ∧ true) 
c  in CNF:
c    -b^{86, 4}_2 ∨ -b^{86, 4}_1 ∨ -b^{86, 4}_0 ∨ false 
c  in DIMACS:
-18824 -18825 -18826  0

c i = 5
c  -2+1 --> -1
c    ( b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧  p_430) -> ( b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0)
c  in CNF:
c    -b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨  b^{86, 6}_2
c    -b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_1
c    -b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨  b^{86, 6}_0
c  in DIMACS:
-18827 -18828  18829 -430  18830 0
-18827 -18828  18829 -430 -18831 0
-18827 -18828  18829 -430  18832 0

c  -1+1 --> 0
c    ( b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0 ∧  p_430) -> (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧ -b^{86, 6}_0)
c  in CNF:
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_2
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_1
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_0
c  in DIMACS:
-18827  18828 -18829 -430 -18830 0
-18827  18828 -18829 -430 -18831 0
-18827  18828 -18829 -430 -18832 0

c  0+1 --> 1
c    (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧  p_430) -> (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0)
c  in CNF:
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_2
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_1
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨  b^{86, 6}_0
c  in DIMACS:
 18827  18828  18829 -430 -18830 0
 18827  18828  18829 -430 -18831 0
 18827  18828  18829 -430  18832 0

c  1+1 --> 2
c    (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0 ∧  p_430) -> (-b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0)
c  in CNF:
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_2
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨  b^{86, 6}_1
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ -p_430 ∨ -b^{86, 6}_0
c  in DIMACS:
 18827  18828 -18829 -430 -18830 0
 18827  18828 -18829 -430  18831 0
 18827  18828 -18829 -430 -18832 0

c  2+1 --> break 
c    (-b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧  p_430) -> break
c  in CNF:
c     b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 18827 -18828  18829 -430 1162 0


c  2-1 --> 1
c    (-b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧ -p_430) -> (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0)
c  in CNF:
c     b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_2
c     b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_1
c     b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨  b^{86, 6}_0
c  in DIMACS:
 18827 -18828  18829  430 -18830 0
 18827 -18828  18829  430 -18831 0
 18827 -18828  18829  430  18832 0

c  1-1 --> 0
c    (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0 ∧ -p_430) -> (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧ -b^{86, 6}_0)
c  in CNF:
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_2
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_1
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_0
c  in DIMACS:
 18827  18828 -18829  430 -18830 0
 18827  18828 -18829  430 -18831 0
 18827  18828 -18829  430 -18832 0

c  0-1 --> -1
c    (-b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧ -p_430) -> ( b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0)
c  in CNF:
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨  b^{86, 6}_2
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_1
c     b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨  b^{86, 6}_0
c  in DIMACS:
 18827  18828  18829  430  18830 0
 18827  18828  18829  430 -18831 0
 18827  18828  18829  430  18832 0

c  -1-1 --> -2
c    ( b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧  b^{86, 5}_0 ∧ -p_430) -> ( b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0)
c  in CNF:
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨  b^{86, 6}_2
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨  b^{86, 6}_1
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨  p_430 ∨ -b^{86, 6}_0
c  in DIMACS:
-18827  18828 -18829  430  18830 0
-18827  18828 -18829  430  18831 0
-18827  18828 -18829  430 -18832 0

c  -2-1 --> break 
c    ( b^{86, 5}_2 ∧  b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨  b^{86, 5}_0 ∨  p_430 ∨ break
c  in DIMACS:
-18827 -18828  18829  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 5}_2 ∧ -b^{86, 5}_1 ∧ -b^{86, 5}_0 ∧ true) 
c  in CNF:
c    -b^{86, 5}_2 ∨  b^{86, 5}_1 ∨  b^{86, 5}_0 ∨ false 
c  in DIMACS:
-18827  18828  18829  0

c  3 does not represent an automaton state.
c    -(-b^{86, 5}_2 ∧  b^{86, 5}_1 ∧  b^{86, 5}_0 ∧ true) 
c  in CNF:
c     b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ false 
c  in DIMACS:
 18827 -18828 -18829  0
c  -3 does not represent an automaton state.
c    -( b^{86, 5}_2 ∧  b^{86, 5}_1 ∧  b^{86, 5}_0 ∧ true) 
c  in CNF:
c    -b^{86, 5}_2 ∨ -b^{86, 5}_1 ∨ -b^{86, 5}_0 ∨ false 
c  in DIMACS:
-18827 -18828 -18829  0

c i = 6
c  -2+1 --> -1
c    ( b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧  p_516) -> ( b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0)
c  in CNF:
c    -b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨  b^{86, 7}_2
c    -b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_1
c    -b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨  b^{86, 7}_0
c  in DIMACS:
-18830 -18831  18832 -516  18833 0
-18830 -18831  18832 -516 -18834 0
-18830 -18831  18832 -516  18835 0

c  -1+1 --> 0
c    ( b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0 ∧  p_516) -> (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧ -b^{86, 7}_0)
c  in CNF:
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_2
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_1
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_0
c  in DIMACS:
-18830  18831 -18832 -516 -18833 0
-18830  18831 -18832 -516 -18834 0
-18830  18831 -18832 -516 -18835 0

c  0+1 --> 1
c    (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧  p_516) -> (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0)
c  in CNF:
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_2
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_1
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨  b^{86, 7}_0
c  in DIMACS:
 18830  18831  18832 -516 -18833 0
 18830  18831  18832 -516 -18834 0
 18830  18831  18832 -516  18835 0

c  1+1 --> 2
c    (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0 ∧  p_516) -> (-b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0)
c  in CNF:
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_2
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨  b^{86, 7}_1
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ -p_516 ∨ -b^{86, 7}_0
c  in DIMACS:
 18830  18831 -18832 -516 -18833 0
 18830  18831 -18832 -516  18834 0
 18830  18831 -18832 -516 -18835 0

c  2+1 --> break 
c    (-b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧  p_516) -> break
c  in CNF:
c     b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 18830 -18831  18832 -516 1162 0


c  2-1 --> 1
c    (-b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧ -p_516) -> (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0)
c  in CNF:
c     b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_2
c     b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_1
c     b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨  b^{86, 7}_0
c  in DIMACS:
 18830 -18831  18832  516 -18833 0
 18830 -18831  18832  516 -18834 0
 18830 -18831  18832  516  18835 0

c  1-1 --> 0
c    (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0 ∧ -p_516) -> (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧ -b^{86, 7}_0)
c  in CNF:
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_2
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_1
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_0
c  in DIMACS:
 18830  18831 -18832  516 -18833 0
 18830  18831 -18832  516 -18834 0
 18830  18831 -18832  516 -18835 0

c  0-1 --> -1
c    (-b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧ -p_516) -> ( b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0)
c  in CNF:
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨  b^{86, 7}_2
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_1
c     b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨  b^{86, 7}_0
c  in DIMACS:
 18830  18831  18832  516  18833 0
 18830  18831  18832  516 -18834 0
 18830  18831  18832  516  18835 0

c  -1-1 --> -2
c    ( b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧  b^{86, 6}_0 ∧ -p_516) -> ( b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0)
c  in CNF:
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨  b^{86, 7}_2
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨  b^{86, 7}_1
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨  p_516 ∨ -b^{86, 7}_0
c  in DIMACS:
-18830  18831 -18832  516  18833 0
-18830  18831 -18832  516  18834 0
-18830  18831 -18832  516 -18835 0

c  -2-1 --> break 
c    ( b^{86, 6}_2 ∧  b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨  b^{86, 6}_0 ∨  p_516 ∨ break
c  in DIMACS:
-18830 -18831  18832  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 6}_2 ∧ -b^{86, 6}_1 ∧ -b^{86, 6}_0 ∧ true) 
c  in CNF:
c    -b^{86, 6}_2 ∨  b^{86, 6}_1 ∨  b^{86, 6}_0 ∨ false 
c  in DIMACS:
-18830  18831  18832  0

c  3 does not represent an automaton state.
c    -(-b^{86, 6}_2 ∧  b^{86, 6}_1 ∧  b^{86, 6}_0 ∧ true) 
c  in CNF:
c     b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ false 
c  in DIMACS:
 18830 -18831 -18832  0
c  -3 does not represent an automaton state.
c    -( b^{86, 6}_2 ∧  b^{86, 6}_1 ∧  b^{86, 6}_0 ∧ true) 
c  in CNF:
c    -b^{86, 6}_2 ∨ -b^{86, 6}_1 ∨ -b^{86, 6}_0 ∨ false 
c  in DIMACS:
-18830 -18831 -18832  0

c i = 7
c  -2+1 --> -1
c    ( b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧  p_602) -> ( b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0)
c  in CNF:
c    -b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨  b^{86, 8}_2
c    -b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_1
c    -b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨  b^{86, 8}_0
c  in DIMACS:
-18833 -18834  18835 -602  18836 0
-18833 -18834  18835 -602 -18837 0
-18833 -18834  18835 -602  18838 0

c  -1+1 --> 0
c    ( b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0 ∧  p_602) -> (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧ -b^{86, 8}_0)
c  in CNF:
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_2
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_1
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_0
c  in DIMACS:
-18833  18834 -18835 -602 -18836 0
-18833  18834 -18835 -602 -18837 0
-18833  18834 -18835 -602 -18838 0

c  0+1 --> 1
c    (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧  p_602) -> (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0)
c  in CNF:
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_2
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_1
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨  b^{86, 8}_0
c  in DIMACS:
 18833  18834  18835 -602 -18836 0
 18833  18834  18835 -602 -18837 0
 18833  18834  18835 -602  18838 0

c  1+1 --> 2
c    (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0 ∧  p_602) -> (-b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0)
c  in CNF:
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_2
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨  b^{86, 8}_1
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ -p_602 ∨ -b^{86, 8}_0
c  in DIMACS:
 18833  18834 -18835 -602 -18836 0
 18833  18834 -18835 -602  18837 0
 18833  18834 -18835 -602 -18838 0

c  2+1 --> break 
c    (-b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧  p_602) -> break
c  in CNF:
c     b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 18833 -18834  18835 -602 1162 0


c  2-1 --> 1
c    (-b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧ -p_602) -> (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0)
c  in CNF:
c     b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_2
c     b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_1
c     b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨  b^{86, 8}_0
c  in DIMACS:
 18833 -18834  18835  602 -18836 0
 18833 -18834  18835  602 -18837 0
 18833 -18834  18835  602  18838 0

c  1-1 --> 0
c    (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0 ∧ -p_602) -> (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧ -b^{86, 8}_0)
c  in CNF:
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_2
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_1
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_0
c  in DIMACS:
 18833  18834 -18835  602 -18836 0
 18833  18834 -18835  602 -18837 0
 18833  18834 -18835  602 -18838 0

c  0-1 --> -1
c    (-b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧ -p_602) -> ( b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0)
c  in CNF:
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨  b^{86, 8}_2
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_1
c     b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨  b^{86, 8}_0
c  in DIMACS:
 18833  18834  18835  602  18836 0
 18833  18834  18835  602 -18837 0
 18833  18834  18835  602  18838 0

c  -1-1 --> -2
c    ( b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧  b^{86, 7}_0 ∧ -p_602) -> ( b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0)
c  in CNF:
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨  b^{86, 8}_2
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨  b^{86, 8}_1
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨  p_602 ∨ -b^{86, 8}_0
c  in DIMACS:
-18833  18834 -18835  602  18836 0
-18833  18834 -18835  602  18837 0
-18833  18834 -18835  602 -18838 0

c  -2-1 --> break 
c    ( b^{86, 7}_2 ∧  b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨  b^{86, 7}_0 ∨  p_602 ∨ break
c  in DIMACS:
-18833 -18834  18835  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 7}_2 ∧ -b^{86, 7}_1 ∧ -b^{86, 7}_0 ∧ true) 
c  in CNF:
c    -b^{86, 7}_2 ∨  b^{86, 7}_1 ∨  b^{86, 7}_0 ∨ false 
c  in DIMACS:
-18833  18834  18835  0

c  3 does not represent an automaton state.
c    -(-b^{86, 7}_2 ∧  b^{86, 7}_1 ∧  b^{86, 7}_0 ∧ true) 
c  in CNF:
c     b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ false 
c  in DIMACS:
 18833 -18834 -18835  0
c  -3 does not represent an automaton state.
c    -( b^{86, 7}_2 ∧  b^{86, 7}_1 ∧  b^{86, 7}_0 ∧ true) 
c  in CNF:
c    -b^{86, 7}_2 ∨ -b^{86, 7}_1 ∨ -b^{86, 7}_0 ∨ false 
c  in DIMACS:
-18833 -18834 -18835  0

c i = 8
c  -2+1 --> -1
c    ( b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧  p_688) -> ( b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0)
c  in CNF:
c    -b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨  b^{86, 9}_2
c    -b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_1
c    -b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨  b^{86, 9}_0
c  in DIMACS:
-18836 -18837  18838 -688  18839 0
-18836 -18837  18838 -688 -18840 0
-18836 -18837  18838 -688  18841 0

c  -1+1 --> 0
c    ( b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0 ∧  p_688) -> (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧ -b^{86, 9}_0)
c  in CNF:
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_2
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_1
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_0
c  in DIMACS:
-18836  18837 -18838 -688 -18839 0
-18836  18837 -18838 -688 -18840 0
-18836  18837 -18838 -688 -18841 0

c  0+1 --> 1
c    (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧  p_688) -> (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0)
c  in CNF:
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_2
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_1
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨  b^{86, 9}_0
c  in DIMACS:
 18836  18837  18838 -688 -18839 0
 18836  18837  18838 -688 -18840 0
 18836  18837  18838 -688  18841 0

c  1+1 --> 2
c    (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0 ∧  p_688) -> (-b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0)
c  in CNF:
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_2
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨  b^{86, 9}_1
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ -p_688 ∨ -b^{86, 9}_0
c  in DIMACS:
 18836  18837 -18838 -688 -18839 0
 18836  18837 -18838 -688  18840 0
 18836  18837 -18838 -688 -18841 0

c  2+1 --> break 
c    (-b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧  p_688) -> break
c  in CNF:
c     b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 18836 -18837  18838 -688 1162 0


c  2-1 --> 1
c    (-b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧ -p_688) -> (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0)
c  in CNF:
c     b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_2
c     b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_1
c     b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨  b^{86, 9}_0
c  in DIMACS:
 18836 -18837  18838  688 -18839 0
 18836 -18837  18838  688 -18840 0
 18836 -18837  18838  688  18841 0

c  1-1 --> 0
c    (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0 ∧ -p_688) -> (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧ -b^{86, 9}_0)
c  in CNF:
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_2
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_1
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_0
c  in DIMACS:
 18836  18837 -18838  688 -18839 0
 18836  18837 -18838  688 -18840 0
 18836  18837 -18838  688 -18841 0

c  0-1 --> -1
c    (-b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧ -p_688) -> ( b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0)
c  in CNF:
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨  b^{86, 9}_2
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_1
c     b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨  b^{86, 9}_0
c  in DIMACS:
 18836  18837  18838  688  18839 0
 18836  18837  18838  688 -18840 0
 18836  18837  18838  688  18841 0

c  -1-1 --> -2
c    ( b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧  b^{86, 8}_0 ∧ -p_688) -> ( b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0)
c  in CNF:
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨  b^{86, 9}_2
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨  b^{86, 9}_1
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨  p_688 ∨ -b^{86, 9}_0
c  in DIMACS:
-18836  18837 -18838  688  18839 0
-18836  18837 -18838  688  18840 0
-18836  18837 -18838  688 -18841 0

c  -2-1 --> break 
c    ( b^{86, 8}_2 ∧  b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨  b^{86, 8}_0 ∨  p_688 ∨ break
c  in DIMACS:
-18836 -18837  18838  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 8}_2 ∧ -b^{86, 8}_1 ∧ -b^{86, 8}_0 ∧ true) 
c  in CNF:
c    -b^{86, 8}_2 ∨  b^{86, 8}_1 ∨  b^{86, 8}_0 ∨ false 
c  in DIMACS:
-18836  18837  18838  0

c  3 does not represent an automaton state.
c    -(-b^{86, 8}_2 ∧  b^{86, 8}_1 ∧  b^{86, 8}_0 ∧ true) 
c  in CNF:
c     b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ false 
c  in DIMACS:
 18836 -18837 -18838  0
c  -3 does not represent an automaton state.
c    -( b^{86, 8}_2 ∧  b^{86, 8}_1 ∧  b^{86, 8}_0 ∧ true) 
c  in CNF:
c    -b^{86, 8}_2 ∨ -b^{86, 8}_1 ∨ -b^{86, 8}_0 ∨ false 
c  in DIMACS:
-18836 -18837 -18838  0

c i = 9
c  -2+1 --> -1
c    ( b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧  p_774) -> ( b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0)
c  in CNF:
c    -b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨  b^{86, 10}_2
c    -b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_1
c    -b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨  b^{86, 10}_0
c  in DIMACS:
-18839 -18840  18841 -774  18842 0
-18839 -18840  18841 -774 -18843 0
-18839 -18840  18841 -774  18844 0

c  -1+1 --> 0
c    ( b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0 ∧  p_774) -> (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧ -b^{86, 10}_0)
c  in CNF:
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_2
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_1
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_0
c  in DIMACS:
-18839  18840 -18841 -774 -18842 0
-18839  18840 -18841 -774 -18843 0
-18839  18840 -18841 -774 -18844 0

c  0+1 --> 1
c    (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧  p_774) -> (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0)
c  in CNF:
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_2
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_1
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨  b^{86, 10}_0
c  in DIMACS:
 18839  18840  18841 -774 -18842 0
 18839  18840  18841 -774 -18843 0
 18839  18840  18841 -774  18844 0

c  1+1 --> 2
c    (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0 ∧  p_774) -> (-b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0)
c  in CNF:
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_2
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨  b^{86, 10}_1
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ -p_774 ∨ -b^{86, 10}_0
c  in DIMACS:
 18839  18840 -18841 -774 -18842 0
 18839  18840 -18841 -774  18843 0
 18839  18840 -18841 -774 -18844 0

c  2+1 --> break 
c    (-b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧  p_774) -> break
c  in CNF:
c     b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 18839 -18840  18841 -774 1162 0


c  2-1 --> 1
c    (-b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧ -p_774) -> (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0)
c  in CNF:
c     b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_2
c     b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_1
c     b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨  b^{86, 10}_0
c  in DIMACS:
 18839 -18840  18841  774 -18842 0
 18839 -18840  18841  774 -18843 0
 18839 -18840  18841  774  18844 0

c  1-1 --> 0
c    (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0 ∧ -p_774) -> (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧ -b^{86, 10}_0)
c  in CNF:
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_2
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_1
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_0
c  in DIMACS:
 18839  18840 -18841  774 -18842 0
 18839  18840 -18841  774 -18843 0
 18839  18840 -18841  774 -18844 0

c  0-1 --> -1
c    (-b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧ -p_774) -> ( b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0)
c  in CNF:
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨  b^{86, 10}_2
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_1
c     b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨  b^{86, 10}_0
c  in DIMACS:
 18839  18840  18841  774  18842 0
 18839  18840  18841  774 -18843 0
 18839  18840  18841  774  18844 0

c  -1-1 --> -2
c    ( b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧  b^{86, 9}_0 ∧ -p_774) -> ( b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0)
c  in CNF:
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨  b^{86, 10}_2
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨  b^{86, 10}_1
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨  p_774 ∨ -b^{86, 10}_0
c  in DIMACS:
-18839  18840 -18841  774  18842 0
-18839  18840 -18841  774  18843 0
-18839  18840 -18841  774 -18844 0

c  -2-1 --> break 
c    ( b^{86, 9}_2 ∧  b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨  b^{86, 9}_0 ∨  p_774 ∨ break
c  in DIMACS:
-18839 -18840  18841  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 9}_2 ∧ -b^{86, 9}_1 ∧ -b^{86, 9}_0 ∧ true) 
c  in CNF:
c    -b^{86, 9}_2 ∨  b^{86, 9}_1 ∨  b^{86, 9}_0 ∨ false 
c  in DIMACS:
-18839  18840  18841  0

c  3 does not represent an automaton state.
c    -(-b^{86, 9}_2 ∧  b^{86, 9}_1 ∧  b^{86, 9}_0 ∧ true) 
c  in CNF:
c     b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ false 
c  in DIMACS:
 18839 -18840 -18841  0
c  -3 does not represent an automaton state.
c    -( b^{86, 9}_2 ∧  b^{86, 9}_1 ∧  b^{86, 9}_0 ∧ true) 
c  in CNF:
c    -b^{86, 9}_2 ∨ -b^{86, 9}_1 ∨ -b^{86, 9}_0 ∨ false 
c  in DIMACS:
-18839 -18840 -18841  0

c i = 10
c  -2+1 --> -1
c    ( b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧  p_860) -> ( b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0)
c  in CNF:
c    -b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨  b^{86, 11}_2
c    -b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_1
c    -b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨  b^{86, 11}_0
c  in DIMACS:
-18842 -18843  18844 -860  18845 0
-18842 -18843  18844 -860 -18846 0
-18842 -18843  18844 -860  18847 0

c  -1+1 --> 0
c    ( b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0 ∧  p_860) -> (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧ -b^{86, 11}_0)
c  in CNF:
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_2
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_1
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_0
c  in DIMACS:
-18842  18843 -18844 -860 -18845 0
-18842  18843 -18844 -860 -18846 0
-18842  18843 -18844 -860 -18847 0

c  0+1 --> 1
c    (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧  p_860) -> (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0)
c  in CNF:
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_2
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_1
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨  b^{86, 11}_0
c  in DIMACS:
 18842  18843  18844 -860 -18845 0
 18842  18843  18844 -860 -18846 0
 18842  18843  18844 -860  18847 0

c  1+1 --> 2
c    (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0 ∧  p_860) -> (-b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0)
c  in CNF:
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_2
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨  b^{86, 11}_1
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ -p_860 ∨ -b^{86, 11}_0
c  in DIMACS:
 18842  18843 -18844 -860 -18845 0
 18842  18843 -18844 -860  18846 0
 18842  18843 -18844 -860 -18847 0

c  2+1 --> break 
c    (-b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧  p_860) -> break
c  in CNF:
c     b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 18842 -18843  18844 -860 1162 0


c  2-1 --> 1
c    (-b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧ -p_860) -> (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0)
c  in CNF:
c     b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_2
c     b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_1
c     b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨  b^{86, 11}_0
c  in DIMACS:
 18842 -18843  18844  860 -18845 0
 18842 -18843  18844  860 -18846 0
 18842 -18843  18844  860  18847 0

c  1-1 --> 0
c    (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0 ∧ -p_860) -> (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧ -b^{86, 11}_0)
c  in CNF:
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_2
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_1
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_0
c  in DIMACS:
 18842  18843 -18844  860 -18845 0
 18842  18843 -18844  860 -18846 0
 18842  18843 -18844  860 -18847 0

c  0-1 --> -1
c    (-b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧ -p_860) -> ( b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0)
c  in CNF:
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨  b^{86, 11}_2
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_1
c     b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨  b^{86, 11}_0
c  in DIMACS:
 18842  18843  18844  860  18845 0
 18842  18843  18844  860 -18846 0
 18842  18843  18844  860  18847 0

c  -1-1 --> -2
c    ( b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧  b^{86, 10}_0 ∧ -p_860) -> ( b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0)
c  in CNF:
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨  b^{86, 11}_2
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨  b^{86, 11}_1
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨  p_860 ∨ -b^{86, 11}_0
c  in DIMACS:
-18842  18843 -18844  860  18845 0
-18842  18843 -18844  860  18846 0
-18842  18843 -18844  860 -18847 0

c  -2-1 --> break 
c    ( b^{86, 10}_2 ∧  b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨  b^{86, 10}_0 ∨  p_860 ∨ break
c  in DIMACS:
-18842 -18843  18844  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 10}_2 ∧ -b^{86, 10}_1 ∧ -b^{86, 10}_0 ∧ true) 
c  in CNF:
c    -b^{86, 10}_2 ∨  b^{86, 10}_1 ∨  b^{86, 10}_0 ∨ false 
c  in DIMACS:
-18842  18843  18844  0

c  3 does not represent an automaton state.
c    -(-b^{86, 10}_2 ∧  b^{86, 10}_1 ∧  b^{86, 10}_0 ∧ true) 
c  in CNF:
c     b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ false 
c  in DIMACS:
 18842 -18843 -18844  0
c  -3 does not represent an automaton state.
c    -( b^{86, 10}_2 ∧  b^{86, 10}_1 ∧  b^{86, 10}_0 ∧ true) 
c  in CNF:
c    -b^{86, 10}_2 ∨ -b^{86, 10}_1 ∨ -b^{86, 10}_0 ∨ false 
c  in DIMACS:
-18842 -18843 -18844  0

c i = 11
c  -2+1 --> -1
c    ( b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧  p_946) -> ( b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0)
c  in CNF:
c    -b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨  b^{86, 12}_2
c    -b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_1
c    -b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨  b^{86, 12}_0
c  in DIMACS:
-18845 -18846  18847 -946  18848 0
-18845 -18846  18847 -946 -18849 0
-18845 -18846  18847 -946  18850 0

c  -1+1 --> 0
c    ( b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0 ∧  p_946) -> (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧ -b^{86, 12}_0)
c  in CNF:
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_2
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_1
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_0
c  in DIMACS:
-18845  18846 -18847 -946 -18848 0
-18845  18846 -18847 -946 -18849 0
-18845  18846 -18847 -946 -18850 0

c  0+1 --> 1
c    (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧  p_946) -> (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0)
c  in CNF:
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_2
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_1
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨  b^{86, 12}_0
c  in DIMACS:
 18845  18846  18847 -946 -18848 0
 18845  18846  18847 -946 -18849 0
 18845  18846  18847 -946  18850 0

c  1+1 --> 2
c    (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0 ∧  p_946) -> (-b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0)
c  in CNF:
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_2
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨  b^{86, 12}_1
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ -p_946 ∨ -b^{86, 12}_0
c  in DIMACS:
 18845  18846 -18847 -946 -18848 0
 18845  18846 -18847 -946  18849 0
 18845  18846 -18847 -946 -18850 0

c  2+1 --> break 
c    (-b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧  p_946) -> break
c  in CNF:
c     b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ -p_946 ∨ break
c  in DIMACS:
 18845 -18846  18847 -946 1162 0


c  2-1 --> 1
c    (-b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧ -p_946) -> (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0)
c  in CNF:
c     b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_2
c     b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_1
c     b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨  b^{86, 12}_0
c  in DIMACS:
 18845 -18846  18847  946 -18848 0
 18845 -18846  18847  946 -18849 0
 18845 -18846  18847  946  18850 0

c  1-1 --> 0
c    (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0 ∧ -p_946) -> (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧ -b^{86, 12}_0)
c  in CNF:
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_2
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_1
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_0
c  in DIMACS:
 18845  18846 -18847  946 -18848 0
 18845  18846 -18847  946 -18849 0
 18845  18846 -18847  946 -18850 0

c  0-1 --> -1
c    (-b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧ -p_946) -> ( b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0)
c  in CNF:
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨  b^{86, 12}_2
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_1
c     b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨  b^{86, 12}_0
c  in DIMACS:
 18845  18846  18847  946  18848 0
 18845  18846  18847  946 -18849 0
 18845  18846  18847  946  18850 0

c  -1-1 --> -2
c    ( b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧  b^{86, 11}_0 ∧ -p_946) -> ( b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0)
c  in CNF:
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨  b^{86, 12}_2
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨  b^{86, 12}_1
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨  p_946 ∨ -b^{86, 12}_0
c  in DIMACS:
-18845  18846 -18847  946  18848 0
-18845  18846 -18847  946  18849 0
-18845  18846 -18847  946 -18850 0

c  -2-1 --> break 
c    ( b^{86, 11}_2 ∧  b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧ -p_946) -> break
c  in CNF:
c    -b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨  b^{86, 11}_0 ∨  p_946 ∨ break
c  in DIMACS:
-18845 -18846  18847  946 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 11}_2 ∧ -b^{86, 11}_1 ∧ -b^{86, 11}_0 ∧ true) 
c  in CNF:
c    -b^{86, 11}_2 ∨  b^{86, 11}_1 ∨  b^{86, 11}_0 ∨ false 
c  in DIMACS:
-18845  18846  18847  0

c  3 does not represent an automaton state.
c    -(-b^{86, 11}_2 ∧  b^{86, 11}_1 ∧  b^{86, 11}_0 ∧ true) 
c  in CNF:
c     b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ false 
c  in DIMACS:
 18845 -18846 -18847  0
c  -3 does not represent an automaton state.
c    -( b^{86, 11}_2 ∧  b^{86, 11}_1 ∧  b^{86, 11}_0 ∧ true) 
c  in CNF:
c    -b^{86, 11}_2 ∨ -b^{86, 11}_1 ∨ -b^{86, 11}_0 ∨ false 
c  in DIMACS:
-18845 -18846 -18847  0

c i = 12
c  -2+1 --> -1
c    ( b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧  p_1032) -> ( b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0)
c  in CNF:
c    -b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨  b^{86, 13}_2
c    -b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_1
c    -b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨  b^{86, 13}_0
c  in DIMACS:
-18848 -18849  18850 -1032  18851 0
-18848 -18849  18850 -1032 -18852 0
-18848 -18849  18850 -1032  18853 0

c  -1+1 --> 0
c    ( b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0 ∧  p_1032) -> (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧ -b^{86, 13}_0)
c  in CNF:
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_2
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_1
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_0
c  in DIMACS:
-18848  18849 -18850 -1032 -18851 0
-18848  18849 -18850 -1032 -18852 0
-18848  18849 -18850 -1032 -18853 0

c  0+1 --> 1
c    (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧  p_1032) -> (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0)
c  in CNF:
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_2
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_1
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨  b^{86, 13}_0
c  in DIMACS:
 18848  18849  18850 -1032 -18851 0
 18848  18849  18850 -1032 -18852 0
 18848  18849  18850 -1032  18853 0

c  1+1 --> 2
c    (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0 ∧  p_1032) -> (-b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0)
c  in CNF:
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_2
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨  b^{86, 13}_1
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ -p_1032 ∨ -b^{86, 13}_0
c  in DIMACS:
 18848  18849 -18850 -1032 -18851 0
 18848  18849 -18850 -1032  18852 0
 18848  18849 -18850 -1032 -18853 0

c  2+1 --> break 
c    (-b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 18848 -18849  18850 -1032 1162 0


c  2-1 --> 1
c    (-b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧ -p_1032) -> (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0)
c  in CNF:
c     b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_2
c     b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_1
c     b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨  b^{86, 13}_0
c  in DIMACS:
 18848 -18849  18850  1032 -18851 0
 18848 -18849  18850  1032 -18852 0
 18848 -18849  18850  1032  18853 0

c  1-1 --> 0
c    (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0 ∧ -p_1032) -> (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧ -b^{86, 13}_0)
c  in CNF:
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_2
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_1
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_0
c  in DIMACS:
 18848  18849 -18850  1032 -18851 0
 18848  18849 -18850  1032 -18852 0
 18848  18849 -18850  1032 -18853 0

c  0-1 --> -1
c    (-b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧ -p_1032) -> ( b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0)
c  in CNF:
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨  b^{86, 13}_2
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_1
c     b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨  b^{86, 13}_0
c  in DIMACS:
 18848  18849  18850  1032  18851 0
 18848  18849  18850  1032 -18852 0
 18848  18849  18850  1032  18853 0

c  -1-1 --> -2
c    ( b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧  b^{86, 12}_0 ∧ -p_1032) -> ( b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0)
c  in CNF:
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨  b^{86, 13}_2
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨  b^{86, 13}_1
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨  p_1032 ∨ -b^{86, 13}_0
c  in DIMACS:
-18848  18849 -18850  1032  18851 0
-18848  18849 -18850  1032  18852 0
-18848  18849 -18850  1032 -18853 0

c  -2-1 --> break 
c    ( b^{86, 12}_2 ∧  b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨  b^{86, 12}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-18848 -18849  18850  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 12}_2 ∧ -b^{86, 12}_1 ∧ -b^{86, 12}_0 ∧ true) 
c  in CNF:
c    -b^{86, 12}_2 ∨  b^{86, 12}_1 ∨  b^{86, 12}_0 ∨ false 
c  in DIMACS:
-18848  18849  18850  0

c  3 does not represent an automaton state.
c    -(-b^{86, 12}_2 ∧  b^{86, 12}_1 ∧  b^{86, 12}_0 ∧ true) 
c  in CNF:
c     b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ false 
c  in DIMACS:
 18848 -18849 -18850  0
c  -3 does not represent an automaton state.
c    -( b^{86, 12}_2 ∧  b^{86, 12}_1 ∧  b^{86, 12}_0 ∧ true) 
c  in CNF:
c    -b^{86, 12}_2 ∨ -b^{86, 12}_1 ∨ -b^{86, 12}_0 ∨ false 
c  in DIMACS:
-18848 -18849 -18850  0

c i = 13
c  -2+1 --> -1
c    ( b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧  p_1118) -> ( b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧  b^{86, 14}_0)
c  in CNF:
c    -b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨  b^{86, 14}_2
c    -b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_1
c    -b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨  b^{86, 14}_0
c  in DIMACS:
-18851 -18852  18853 -1118  18854 0
-18851 -18852  18853 -1118 -18855 0
-18851 -18852  18853 -1118  18856 0

c  -1+1 --> 0
c    ( b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0 ∧  p_1118) -> (-b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧ -b^{86, 14}_0)
c  in CNF:
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_2
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_1
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_0
c  in DIMACS:
-18851  18852 -18853 -1118 -18854 0
-18851  18852 -18853 -1118 -18855 0
-18851  18852 -18853 -1118 -18856 0

c  0+1 --> 1
c    (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧  p_1118) -> (-b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧  b^{86, 14}_0)
c  in CNF:
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_2
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_1
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨  b^{86, 14}_0
c  in DIMACS:
 18851  18852  18853 -1118 -18854 0
 18851  18852  18853 -1118 -18855 0
 18851  18852  18853 -1118  18856 0

c  1+1 --> 2
c    (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0 ∧  p_1118) -> (-b^{86, 14}_2 ∧  b^{86, 14}_1 ∧ -b^{86, 14}_0)
c  in CNF:
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_2
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨  b^{86, 14}_1
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ -p_1118 ∨ -b^{86, 14}_0
c  in DIMACS:
 18851  18852 -18853 -1118 -18854 0
 18851  18852 -18853 -1118  18855 0
 18851  18852 -18853 -1118 -18856 0

c  2+1 --> break 
c    (-b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧  p_1118) -> break
c  in CNF:
c     b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ -p_1118 ∨ break
c  in DIMACS:
 18851 -18852  18853 -1118 1162 0


c  2-1 --> 1
c    (-b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧ -p_1118) -> (-b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧  b^{86, 14}_0)
c  in CNF:
c     b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_2
c     b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_1
c     b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨  b^{86, 14}_0
c  in DIMACS:
 18851 -18852  18853  1118 -18854 0
 18851 -18852  18853  1118 -18855 0
 18851 -18852  18853  1118  18856 0

c  1-1 --> 0
c    (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0 ∧ -p_1118) -> (-b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧ -b^{86, 14}_0)
c  in CNF:
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_2
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_1
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_0
c  in DIMACS:
 18851  18852 -18853  1118 -18854 0
 18851  18852 -18853  1118 -18855 0
 18851  18852 -18853  1118 -18856 0

c  0-1 --> -1
c    (-b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧ -p_1118) -> ( b^{86, 14}_2 ∧ -b^{86, 14}_1 ∧  b^{86, 14}_0)
c  in CNF:
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨  b^{86, 14}_2
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_1
c     b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨  b^{86, 14}_0
c  in DIMACS:
 18851  18852  18853  1118  18854 0
 18851  18852  18853  1118 -18855 0
 18851  18852  18853  1118  18856 0

c  -1-1 --> -2
c    ( b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧  b^{86, 13}_0 ∧ -p_1118) -> ( b^{86, 14}_2 ∧  b^{86, 14}_1 ∧ -b^{86, 14}_0)
c  in CNF:
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨  b^{86, 14}_2
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨  b^{86, 14}_1
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨  p_1118 ∨ -b^{86, 14}_0
c  in DIMACS:
-18851  18852 -18853  1118  18854 0
-18851  18852 -18853  1118  18855 0
-18851  18852 -18853  1118 -18856 0

c  -2-1 --> break 
c    ( b^{86, 13}_2 ∧  b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧ -p_1118) -> break
c  in CNF:
c    -b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨  b^{86, 13}_0 ∨  p_1118 ∨ break
c  in DIMACS:
-18851 -18852  18853  1118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{86, 13}_2 ∧ -b^{86, 13}_1 ∧ -b^{86, 13}_0 ∧ true) 
c  in CNF:
c    -b^{86, 13}_2 ∨  b^{86, 13}_1 ∨  b^{86, 13}_0 ∨ false 
c  in DIMACS:
-18851  18852  18853  0

c  3 does not represent an automaton state.
c    -(-b^{86, 13}_2 ∧  b^{86, 13}_1 ∧  b^{86, 13}_0 ∧ true) 
c  in CNF:
c     b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ false 
c  in DIMACS:
 18851 -18852 -18853  0
c  -3 does not represent an automaton state.
c    -( b^{86, 13}_2 ∧  b^{86, 13}_1 ∧  b^{86, 13}_0 ∧ true) 
c  in CNF:
c    -b^{86, 13}_2 ∨ -b^{86, 13}_1 ∨ -b^{86, 13}_0 ∨ false 
c  in DIMACS:
-18851 -18852 -18853  0

c INIT for k = 87
c    -b^{87, 1}_2
c    -b^{87, 1}_1
c    -b^{87, 1}_0
c  in DIMACS:
-18857 0
-18858 0
-18859 0

c Transitions for k = 87
c i = 1
c  -2+1 --> -1
c    ( b^{87, 1}_2 ∧  b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧  p_87) -> ( b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0)
c  in CNF:
c    -b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨  b^{87, 2}_2
c    -b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_1
c    -b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨  b^{87, 2}_0
c  in DIMACS:
-18857 -18858  18859 -87  18860 0
-18857 -18858  18859 -87 -18861 0
-18857 -18858  18859 -87  18862 0

c  -1+1 --> 0
c    ( b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧  b^{87, 1}_0 ∧  p_87) -> (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧ -b^{87, 2}_0)
c  in CNF:
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_2
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_1
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_0
c  in DIMACS:
-18857  18858 -18859 -87 -18860 0
-18857  18858 -18859 -87 -18861 0
-18857  18858 -18859 -87 -18862 0

c  0+1 --> 1
c    (-b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧  p_87) -> (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0)
c  in CNF:
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_2
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_1
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨  b^{87, 2}_0
c  in DIMACS:
 18857  18858  18859 -87 -18860 0
 18857  18858  18859 -87 -18861 0
 18857  18858  18859 -87  18862 0

c  1+1 --> 2
c    (-b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧  b^{87, 1}_0 ∧  p_87) -> (-b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0)
c  in CNF:
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_2
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨  b^{87, 2}_1
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ -p_87 ∨ -b^{87, 2}_0
c  in DIMACS:
 18857  18858 -18859 -87 -18860 0
 18857  18858 -18859 -87  18861 0
 18857  18858 -18859 -87 -18862 0

c  2+1 --> break 
c    (-b^{87, 1}_2 ∧  b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧  p_87) -> break
c  in CNF:
c     b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ -p_87 ∨ break
c  in DIMACS:
 18857 -18858  18859 -87 1162 0


c  2-1 --> 1
c    (-b^{87, 1}_2 ∧  b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧ -p_87) -> (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0)
c  in CNF:
c     b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_2
c     b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_1
c     b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨  b^{87, 2}_0
c  in DIMACS:
 18857 -18858  18859  87 -18860 0
 18857 -18858  18859  87 -18861 0
 18857 -18858  18859  87  18862 0

c  1-1 --> 0
c    (-b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧  b^{87, 1}_0 ∧ -p_87) -> (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧ -b^{87, 2}_0)
c  in CNF:
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_2
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_1
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_0
c  in DIMACS:
 18857  18858 -18859  87 -18860 0
 18857  18858 -18859  87 -18861 0
 18857  18858 -18859  87 -18862 0

c  0-1 --> -1
c    (-b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧ -p_87) -> ( b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0)
c  in CNF:
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨  b^{87, 2}_2
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_1
c     b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨  b^{87, 2}_0
c  in DIMACS:
 18857  18858  18859  87  18860 0
 18857  18858  18859  87 -18861 0
 18857  18858  18859  87  18862 0

c  -1-1 --> -2
c    ( b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧  b^{87, 1}_0 ∧ -p_87) -> ( b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0)
c  in CNF:
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨  b^{87, 2}_2
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨  b^{87, 2}_1
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨  p_87 ∨ -b^{87, 2}_0
c  in DIMACS:
-18857  18858 -18859  87  18860 0
-18857  18858 -18859  87  18861 0
-18857  18858 -18859  87 -18862 0

c  -2-1 --> break 
c    ( b^{87, 1}_2 ∧  b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧ -p_87) -> break
c  in CNF:
c    -b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨  b^{87, 1}_0 ∨  p_87 ∨ break
c  in DIMACS:
-18857 -18858  18859  87 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 1}_2 ∧ -b^{87, 1}_1 ∧ -b^{87, 1}_0 ∧ true) 
c  in CNF:
c    -b^{87, 1}_2 ∨  b^{87, 1}_1 ∨  b^{87, 1}_0 ∨ false 
c  in DIMACS:
-18857  18858  18859  0

c  3 does not represent an automaton state.
c    -(-b^{87, 1}_2 ∧  b^{87, 1}_1 ∧  b^{87, 1}_0 ∧ true) 
c  in CNF:
c     b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ false 
c  in DIMACS:
 18857 -18858 -18859  0
c  -3 does not represent an automaton state.
c    -( b^{87, 1}_2 ∧  b^{87, 1}_1 ∧  b^{87, 1}_0 ∧ true) 
c  in CNF:
c    -b^{87, 1}_2 ∨ -b^{87, 1}_1 ∨ -b^{87, 1}_0 ∨ false 
c  in DIMACS:
-18857 -18858 -18859  0

c i = 2
c  -2+1 --> -1
c    ( b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧  p_174) -> ( b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0)
c  in CNF:
c    -b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨  b^{87, 3}_2
c    -b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_1
c    -b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨  b^{87, 3}_0
c  in DIMACS:
-18860 -18861  18862 -174  18863 0
-18860 -18861  18862 -174 -18864 0
-18860 -18861  18862 -174  18865 0

c  -1+1 --> 0
c    ( b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0 ∧  p_174) -> (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧ -b^{87, 3}_0)
c  in CNF:
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_2
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_1
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_0
c  in DIMACS:
-18860  18861 -18862 -174 -18863 0
-18860  18861 -18862 -174 -18864 0
-18860  18861 -18862 -174 -18865 0

c  0+1 --> 1
c    (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧  p_174) -> (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0)
c  in CNF:
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_2
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_1
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨  b^{87, 3}_0
c  in DIMACS:
 18860  18861  18862 -174 -18863 0
 18860  18861  18862 -174 -18864 0
 18860  18861  18862 -174  18865 0

c  1+1 --> 2
c    (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0 ∧  p_174) -> (-b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0)
c  in CNF:
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_2
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨  b^{87, 3}_1
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ -p_174 ∨ -b^{87, 3}_0
c  in DIMACS:
 18860  18861 -18862 -174 -18863 0
 18860  18861 -18862 -174  18864 0
 18860  18861 -18862 -174 -18865 0

c  2+1 --> break 
c    (-b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧  p_174) -> break
c  in CNF:
c     b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 18860 -18861  18862 -174 1162 0


c  2-1 --> 1
c    (-b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧ -p_174) -> (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0)
c  in CNF:
c     b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_2
c     b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_1
c     b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨  b^{87, 3}_0
c  in DIMACS:
 18860 -18861  18862  174 -18863 0
 18860 -18861  18862  174 -18864 0
 18860 -18861  18862  174  18865 0

c  1-1 --> 0
c    (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0 ∧ -p_174) -> (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧ -b^{87, 3}_0)
c  in CNF:
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_2
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_1
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_0
c  in DIMACS:
 18860  18861 -18862  174 -18863 0
 18860  18861 -18862  174 -18864 0
 18860  18861 -18862  174 -18865 0

c  0-1 --> -1
c    (-b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧ -p_174) -> ( b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0)
c  in CNF:
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨  b^{87, 3}_2
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_1
c     b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨  b^{87, 3}_0
c  in DIMACS:
 18860  18861  18862  174  18863 0
 18860  18861  18862  174 -18864 0
 18860  18861  18862  174  18865 0

c  -1-1 --> -2
c    ( b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧  b^{87, 2}_0 ∧ -p_174) -> ( b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0)
c  in CNF:
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨  b^{87, 3}_2
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨  b^{87, 3}_1
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨  p_174 ∨ -b^{87, 3}_0
c  in DIMACS:
-18860  18861 -18862  174  18863 0
-18860  18861 -18862  174  18864 0
-18860  18861 -18862  174 -18865 0

c  -2-1 --> break 
c    ( b^{87, 2}_2 ∧  b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨  b^{87, 2}_0 ∨  p_174 ∨ break
c  in DIMACS:
-18860 -18861  18862  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 2}_2 ∧ -b^{87, 2}_1 ∧ -b^{87, 2}_0 ∧ true) 
c  in CNF:
c    -b^{87, 2}_2 ∨  b^{87, 2}_1 ∨  b^{87, 2}_0 ∨ false 
c  in DIMACS:
-18860  18861  18862  0

c  3 does not represent an automaton state.
c    -(-b^{87, 2}_2 ∧  b^{87, 2}_1 ∧  b^{87, 2}_0 ∧ true) 
c  in CNF:
c     b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ false 
c  in DIMACS:
 18860 -18861 -18862  0
c  -3 does not represent an automaton state.
c    -( b^{87, 2}_2 ∧  b^{87, 2}_1 ∧  b^{87, 2}_0 ∧ true) 
c  in CNF:
c    -b^{87, 2}_2 ∨ -b^{87, 2}_1 ∨ -b^{87, 2}_0 ∨ false 
c  in DIMACS:
-18860 -18861 -18862  0

c i = 3
c  -2+1 --> -1
c    ( b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧  p_261) -> ( b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0)
c  in CNF:
c    -b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨  b^{87, 4}_2
c    -b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_1
c    -b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨  b^{87, 4}_0
c  in DIMACS:
-18863 -18864  18865 -261  18866 0
-18863 -18864  18865 -261 -18867 0
-18863 -18864  18865 -261  18868 0

c  -1+1 --> 0
c    ( b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0 ∧  p_261) -> (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧ -b^{87, 4}_0)
c  in CNF:
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_2
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_1
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_0
c  in DIMACS:
-18863  18864 -18865 -261 -18866 0
-18863  18864 -18865 -261 -18867 0
-18863  18864 -18865 -261 -18868 0

c  0+1 --> 1
c    (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧  p_261) -> (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0)
c  in CNF:
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_2
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_1
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨  b^{87, 4}_0
c  in DIMACS:
 18863  18864  18865 -261 -18866 0
 18863  18864  18865 -261 -18867 0
 18863  18864  18865 -261  18868 0

c  1+1 --> 2
c    (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0 ∧  p_261) -> (-b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0)
c  in CNF:
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_2
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨  b^{87, 4}_1
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ -p_261 ∨ -b^{87, 4}_0
c  in DIMACS:
 18863  18864 -18865 -261 -18866 0
 18863  18864 -18865 -261  18867 0
 18863  18864 -18865 -261 -18868 0

c  2+1 --> break 
c    (-b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧  p_261) -> break
c  in CNF:
c     b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 18863 -18864  18865 -261 1162 0


c  2-1 --> 1
c    (-b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧ -p_261) -> (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0)
c  in CNF:
c     b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_2
c     b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_1
c     b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨  b^{87, 4}_0
c  in DIMACS:
 18863 -18864  18865  261 -18866 0
 18863 -18864  18865  261 -18867 0
 18863 -18864  18865  261  18868 0

c  1-1 --> 0
c    (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0 ∧ -p_261) -> (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧ -b^{87, 4}_0)
c  in CNF:
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_2
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_1
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_0
c  in DIMACS:
 18863  18864 -18865  261 -18866 0
 18863  18864 -18865  261 -18867 0
 18863  18864 -18865  261 -18868 0

c  0-1 --> -1
c    (-b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧ -p_261) -> ( b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0)
c  in CNF:
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨  b^{87, 4}_2
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_1
c     b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨  b^{87, 4}_0
c  in DIMACS:
 18863  18864  18865  261  18866 0
 18863  18864  18865  261 -18867 0
 18863  18864  18865  261  18868 0

c  -1-1 --> -2
c    ( b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧  b^{87, 3}_0 ∧ -p_261) -> ( b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0)
c  in CNF:
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨  b^{87, 4}_2
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨  b^{87, 4}_1
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨  p_261 ∨ -b^{87, 4}_0
c  in DIMACS:
-18863  18864 -18865  261  18866 0
-18863  18864 -18865  261  18867 0
-18863  18864 -18865  261 -18868 0

c  -2-1 --> break 
c    ( b^{87, 3}_2 ∧  b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨  b^{87, 3}_0 ∨  p_261 ∨ break
c  in DIMACS:
-18863 -18864  18865  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 3}_2 ∧ -b^{87, 3}_1 ∧ -b^{87, 3}_0 ∧ true) 
c  in CNF:
c    -b^{87, 3}_2 ∨  b^{87, 3}_1 ∨  b^{87, 3}_0 ∨ false 
c  in DIMACS:
-18863  18864  18865  0

c  3 does not represent an automaton state.
c    -(-b^{87, 3}_2 ∧  b^{87, 3}_1 ∧  b^{87, 3}_0 ∧ true) 
c  in CNF:
c     b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ false 
c  in DIMACS:
 18863 -18864 -18865  0
c  -3 does not represent an automaton state.
c    -( b^{87, 3}_2 ∧  b^{87, 3}_1 ∧  b^{87, 3}_0 ∧ true) 
c  in CNF:
c    -b^{87, 3}_2 ∨ -b^{87, 3}_1 ∨ -b^{87, 3}_0 ∨ false 
c  in DIMACS:
-18863 -18864 -18865  0

c i = 4
c  -2+1 --> -1
c    ( b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧  p_348) -> ( b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0)
c  in CNF:
c    -b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨  b^{87, 5}_2
c    -b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_1
c    -b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨  b^{87, 5}_0
c  in DIMACS:
-18866 -18867  18868 -348  18869 0
-18866 -18867  18868 -348 -18870 0
-18866 -18867  18868 -348  18871 0

c  -1+1 --> 0
c    ( b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0 ∧  p_348) -> (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧ -b^{87, 5}_0)
c  in CNF:
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_2
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_1
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_0
c  in DIMACS:
-18866  18867 -18868 -348 -18869 0
-18866  18867 -18868 -348 -18870 0
-18866  18867 -18868 -348 -18871 0

c  0+1 --> 1
c    (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧  p_348) -> (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0)
c  in CNF:
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_2
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_1
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨  b^{87, 5}_0
c  in DIMACS:
 18866  18867  18868 -348 -18869 0
 18866  18867  18868 -348 -18870 0
 18866  18867  18868 -348  18871 0

c  1+1 --> 2
c    (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0 ∧  p_348) -> (-b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0)
c  in CNF:
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_2
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨  b^{87, 5}_1
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ -p_348 ∨ -b^{87, 5}_0
c  in DIMACS:
 18866  18867 -18868 -348 -18869 0
 18866  18867 -18868 -348  18870 0
 18866  18867 -18868 -348 -18871 0

c  2+1 --> break 
c    (-b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧  p_348) -> break
c  in CNF:
c     b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 18866 -18867  18868 -348 1162 0


c  2-1 --> 1
c    (-b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧ -p_348) -> (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0)
c  in CNF:
c     b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_2
c     b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_1
c     b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨  b^{87, 5}_0
c  in DIMACS:
 18866 -18867  18868  348 -18869 0
 18866 -18867  18868  348 -18870 0
 18866 -18867  18868  348  18871 0

c  1-1 --> 0
c    (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0 ∧ -p_348) -> (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧ -b^{87, 5}_0)
c  in CNF:
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_2
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_1
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_0
c  in DIMACS:
 18866  18867 -18868  348 -18869 0
 18866  18867 -18868  348 -18870 0
 18866  18867 -18868  348 -18871 0

c  0-1 --> -1
c    (-b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧ -p_348) -> ( b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0)
c  in CNF:
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨  b^{87, 5}_2
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_1
c     b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨  b^{87, 5}_0
c  in DIMACS:
 18866  18867  18868  348  18869 0
 18866  18867  18868  348 -18870 0
 18866  18867  18868  348  18871 0

c  -1-1 --> -2
c    ( b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧  b^{87, 4}_0 ∧ -p_348) -> ( b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0)
c  in CNF:
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨  b^{87, 5}_2
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨  b^{87, 5}_1
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨  p_348 ∨ -b^{87, 5}_0
c  in DIMACS:
-18866  18867 -18868  348  18869 0
-18866  18867 -18868  348  18870 0
-18866  18867 -18868  348 -18871 0

c  -2-1 --> break 
c    ( b^{87, 4}_2 ∧  b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨  b^{87, 4}_0 ∨  p_348 ∨ break
c  in DIMACS:
-18866 -18867  18868  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 4}_2 ∧ -b^{87, 4}_1 ∧ -b^{87, 4}_0 ∧ true) 
c  in CNF:
c    -b^{87, 4}_2 ∨  b^{87, 4}_1 ∨  b^{87, 4}_0 ∨ false 
c  in DIMACS:
-18866  18867  18868  0

c  3 does not represent an automaton state.
c    -(-b^{87, 4}_2 ∧  b^{87, 4}_1 ∧  b^{87, 4}_0 ∧ true) 
c  in CNF:
c     b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ false 
c  in DIMACS:
 18866 -18867 -18868  0
c  -3 does not represent an automaton state.
c    -( b^{87, 4}_2 ∧  b^{87, 4}_1 ∧  b^{87, 4}_0 ∧ true) 
c  in CNF:
c    -b^{87, 4}_2 ∨ -b^{87, 4}_1 ∨ -b^{87, 4}_0 ∨ false 
c  in DIMACS:
-18866 -18867 -18868  0

c i = 5
c  -2+1 --> -1
c    ( b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧  p_435) -> ( b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0)
c  in CNF:
c    -b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨  b^{87, 6}_2
c    -b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_1
c    -b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨  b^{87, 6}_0
c  in DIMACS:
-18869 -18870  18871 -435  18872 0
-18869 -18870  18871 -435 -18873 0
-18869 -18870  18871 -435  18874 0

c  -1+1 --> 0
c    ( b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0 ∧  p_435) -> (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧ -b^{87, 6}_0)
c  in CNF:
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_2
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_1
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_0
c  in DIMACS:
-18869  18870 -18871 -435 -18872 0
-18869  18870 -18871 -435 -18873 0
-18869  18870 -18871 -435 -18874 0

c  0+1 --> 1
c    (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧  p_435) -> (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0)
c  in CNF:
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_2
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_1
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨  b^{87, 6}_0
c  in DIMACS:
 18869  18870  18871 -435 -18872 0
 18869  18870  18871 -435 -18873 0
 18869  18870  18871 -435  18874 0

c  1+1 --> 2
c    (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0 ∧  p_435) -> (-b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0)
c  in CNF:
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_2
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨  b^{87, 6}_1
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ -p_435 ∨ -b^{87, 6}_0
c  in DIMACS:
 18869  18870 -18871 -435 -18872 0
 18869  18870 -18871 -435  18873 0
 18869  18870 -18871 -435 -18874 0

c  2+1 --> break 
c    (-b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧  p_435) -> break
c  in CNF:
c     b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 18869 -18870  18871 -435 1162 0


c  2-1 --> 1
c    (-b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧ -p_435) -> (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0)
c  in CNF:
c     b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_2
c     b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_1
c     b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨  b^{87, 6}_0
c  in DIMACS:
 18869 -18870  18871  435 -18872 0
 18869 -18870  18871  435 -18873 0
 18869 -18870  18871  435  18874 0

c  1-1 --> 0
c    (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0 ∧ -p_435) -> (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧ -b^{87, 6}_0)
c  in CNF:
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_2
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_1
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_0
c  in DIMACS:
 18869  18870 -18871  435 -18872 0
 18869  18870 -18871  435 -18873 0
 18869  18870 -18871  435 -18874 0

c  0-1 --> -1
c    (-b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧ -p_435) -> ( b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0)
c  in CNF:
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨  b^{87, 6}_2
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_1
c     b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨  b^{87, 6}_0
c  in DIMACS:
 18869  18870  18871  435  18872 0
 18869  18870  18871  435 -18873 0
 18869  18870  18871  435  18874 0

c  -1-1 --> -2
c    ( b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧  b^{87, 5}_0 ∧ -p_435) -> ( b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0)
c  in CNF:
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨  b^{87, 6}_2
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨  b^{87, 6}_1
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨  p_435 ∨ -b^{87, 6}_0
c  in DIMACS:
-18869  18870 -18871  435  18872 0
-18869  18870 -18871  435  18873 0
-18869  18870 -18871  435 -18874 0

c  -2-1 --> break 
c    ( b^{87, 5}_2 ∧  b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨  b^{87, 5}_0 ∨  p_435 ∨ break
c  in DIMACS:
-18869 -18870  18871  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 5}_2 ∧ -b^{87, 5}_1 ∧ -b^{87, 5}_0 ∧ true) 
c  in CNF:
c    -b^{87, 5}_2 ∨  b^{87, 5}_1 ∨  b^{87, 5}_0 ∨ false 
c  in DIMACS:
-18869  18870  18871  0

c  3 does not represent an automaton state.
c    -(-b^{87, 5}_2 ∧  b^{87, 5}_1 ∧  b^{87, 5}_0 ∧ true) 
c  in CNF:
c     b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ false 
c  in DIMACS:
 18869 -18870 -18871  0
c  -3 does not represent an automaton state.
c    -( b^{87, 5}_2 ∧  b^{87, 5}_1 ∧  b^{87, 5}_0 ∧ true) 
c  in CNF:
c    -b^{87, 5}_2 ∨ -b^{87, 5}_1 ∨ -b^{87, 5}_0 ∨ false 
c  in DIMACS:
-18869 -18870 -18871  0

c i = 6
c  -2+1 --> -1
c    ( b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧  p_522) -> ( b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0)
c  in CNF:
c    -b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨  b^{87, 7}_2
c    -b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_1
c    -b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨  b^{87, 7}_0
c  in DIMACS:
-18872 -18873  18874 -522  18875 0
-18872 -18873  18874 -522 -18876 0
-18872 -18873  18874 -522  18877 0

c  -1+1 --> 0
c    ( b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0 ∧  p_522) -> (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧ -b^{87, 7}_0)
c  in CNF:
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_2
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_1
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_0
c  in DIMACS:
-18872  18873 -18874 -522 -18875 0
-18872  18873 -18874 -522 -18876 0
-18872  18873 -18874 -522 -18877 0

c  0+1 --> 1
c    (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧  p_522) -> (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0)
c  in CNF:
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_2
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_1
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨  b^{87, 7}_0
c  in DIMACS:
 18872  18873  18874 -522 -18875 0
 18872  18873  18874 -522 -18876 0
 18872  18873  18874 -522  18877 0

c  1+1 --> 2
c    (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0 ∧  p_522) -> (-b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0)
c  in CNF:
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_2
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨  b^{87, 7}_1
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ -p_522 ∨ -b^{87, 7}_0
c  in DIMACS:
 18872  18873 -18874 -522 -18875 0
 18872  18873 -18874 -522  18876 0
 18872  18873 -18874 -522 -18877 0

c  2+1 --> break 
c    (-b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧  p_522) -> break
c  in CNF:
c     b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 18872 -18873  18874 -522 1162 0


c  2-1 --> 1
c    (-b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧ -p_522) -> (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0)
c  in CNF:
c     b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_2
c     b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_1
c     b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨  b^{87, 7}_0
c  in DIMACS:
 18872 -18873  18874  522 -18875 0
 18872 -18873  18874  522 -18876 0
 18872 -18873  18874  522  18877 0

c  1-1 --> 0
c    (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0 ∧ -p_522) -> (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧ -b^{87, 7}_0)
c  in CNF:
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_2
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_1
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_0
c  in DIMACS:
 18872  18873 -18874  522 -18875 0
 18872  18873 -18874  522 -18876 0
 18872  18873 -18874  522 -18877 0

c  0-1 --> -1
c    (-b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧ -p_522) -> ( b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0)
c  in CNF:
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨  b^{87, 7}_2
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_1
c     b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨  b^{87, 7}_0
c  in DIMACS:
 18872  18873  18874  522  18875 0
 18872  18873  18874  522 -18876 0
 18872  18873  18874  522  18877 0

c  -1-1 --> -2
c    ( b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧  b^{87, 6}_0 ∧ -p_522) -> ( b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0)
c  in CNF:
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨  b^{87, 7}_2
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨  b^{87, 7}_1
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨  p_522 ∨ -b^{87, 7}_0
c  in DIMACS:
-18872  18873 -18874  522  18875 0
-18872  18873 -18874  522  18876 0
-18872  18873 -18874  522 -18877 0

c  -2-1 --> break 
c    ( b^{87, 6}_2 ∧  b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨  b^{87, 6}_0 ∨  p_522 ∨ break
c  in DIMACS:
-18872 -18873  18874  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 6}_2 ∧ -b^{87, 6}_1 ∧ -b^{87, 6}_0 ∧ true) 
c  in CNF:
c    -b^{87, 6}_2 ∨  b^{87, 6}_1 ∨  b^{87, 6}_0 ∨ false 
c  in DIMACS:
-18872  18873  18874  0

c  3 does not represent an automaton state.
c    -(-b^{87, 6}_2 ∧  b^{87, 6}_1 ∧  b^{87, 6}_0 ∧ true) 
c  in CNF:
c     b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ false 
c  in DIMACS:
 18872 -18873 -18874  0
c  -3 does not represent an automaton state.
c    -( b^{87, 6}_2 ∧  b^{87, 6}_1 ∧  b^{87, 6}_0 ∧ true) 
c  in CNF:
c    -b^{87, 6}_2 ∨ -b^{87, 6}_1 ∨ -b^{87, 6}_0 ∨ false 
c  in DIMACS:
-18872 -18873 -18874  0

c i = 7
c  -2+1 --> -1
c    ( b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧  p_609) -> ( b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0)
c  in CNF:
c    -b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨  b^{87, 8}_2
c    -b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_1
c    -b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨  b^{87, 8}_0
c  in DIMACS:
-18875 -18876  18877 -609  18878 0
-18875 -18876  18877 -609 -18879 0
-18875 -18876  18877 -609  18880 0

c  -1+1 --> 0
c    ( b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0 ∧  p_609) -> (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧ -b^{87, 8}_0)
c  in CNF:
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_2
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_1
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_0
c  in DIMACS:
-18875  18876 -18877 -609 -18878 0
-18875  18876 -18877 -609 -18879 0
-18875  18876 -18877 -609 -18880 0

c  0+1 --> 1
c    (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧  p_609) -> (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0)
c  in CNF:
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_2
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_1
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨  b^{87, 8}_0
c  in DIMACS:
 18875  18876  18877 -609 -18878 0
 18875  18876  18877 -609 -18879 0
 18875  18876  18877 -609  18880 0

c  1+1 --> 2
c    (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0 ∧  p_609) -> (-b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0)
c  in CNF:
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_2
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨  b^{87, 8}_1
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ -p_609 ∨ -b^{87, 8}_0
c  in DIMACS:
 18875  18876 -18877 -609 -18878 0
 18875  18876 -18877 -609  18879 0
 18875  18876 -18877 -609 -18880 0

c  2+1 --> break 
c    (-b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧  p_609) -> break
c  in CNF:
c     b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 18875 -18876  18877 -609 1162 0


c  2-1 --> 1
c    (-b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧ -p_609) -> (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0)
c  in CNF:
c     b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_2
c     b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_1
c     b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨  b^{87, 8}_0
c  in DIMACS:
 18875 -18876  18877  609 -18878 0
 18875 -18876  18877  609 -18879 0
 18875 -18876  18877  609  18880 0

c  1-1 --> 0
c    (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0 ∧ -p_609) -> (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧ -b^{87, 8}_0)
c  in CNF:
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_2
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_1
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_0
c  in DIMACS:
 18875  18876 -18877  609 -18878 0
 18875  18876 -18877  609 -18879 0
 18875  18876 -18877  609 -18880 0

c  0-1 --> -1
c    (-b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧ -p_609) -> ( b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0)
c  in CNF:
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨  b^{87, 8}_2
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_1
c     b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨  b^{87, 8}_0
c  in DIMACS:
 18875  18876  18877  609  18878 0
 18875  18876  18877  609 -18879 0
 18875  18876  18877  609  18880 0

c  -1-1 --> -2
c    ( b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧  b^{87, 7}_0 ∧ -p_609) -> ( b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0)
c  in CNF:
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨  b^{87, 8}_2
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨  b^{87, 8}_1
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨  p_609 ∨ -b^{87, 8}_0
c  in DIMACS:
-18875  18876 -18877  609  18878 0
-18875  18876 -18877  609  18879 0
-18875  18876 -18877  609 -18880 0

c  -2-1 --> break 
c    ( b^{87, 7}_2 ∧  b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨  b^{87, 7}_0 ∨  p_609 ∨ break
c  in DIMACS:
-18875 -18876  18877  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 7}_2 ∧ -b^{87, 7}_1 ∧ -b^{87, 7}_0 ∧ true) 
c  in CNF:
c    -b^{87, 7}_2 ∨  b^{87, 7}_1 ∨  b^{87, 7}_0 ∨ false 
c  in DIMACS:
-18875  18876  18877  0

c  3 does not represent an automaton state.
c    -(-b^{87, 7}_2 ∧  b^{87, 7}_1 ∧  b^{87, 7}_0 ∧ true) 
c  in CNF:
c     b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ false 
c  in DIMACS:
 18875 -18876 -18877  0
c  -3 does not represent an automaton state.
c    -( b^{87, 7}_2 ∧  b^{87, 7}_1 ∧  b^{87, 7}_0 ∧ true) 
c  in CNF:
c    -b^{87, 7}_2 ∨ -b^{87, 7}_1 ∨ -b^{87, 7}_0 ∨ false 
c  in DIMACS:
-18875 -18876 -18877  0

c i = 8
c  -2+1 --> -1
c    ( b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧  p_696) -> ( b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0)
c  in CNF:
c    -b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨  b^{87, 9}_2
c    -b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_1
c    -b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨  b^{87, 9}_0
c  in DIMACS:
-18878 -18879  18880 -696  18881 0
-18878 -18879  18880 -696 -18882 0
-18878 -18879  18880 -696  18883 0

c  -1+1 --> 0
c    ( b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0 ∧  p_696) -> (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧ -b^{87, 9}_0)
c  in CNF:
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_2
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_1
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_0
c  in DIMACS:
-18878  18879 -18880 -696 -18881 0
-18878  18879 -18880 -696 -18882 0
-18878  18879 -18880 -696 -18883 0

c  0+1 --> 1
c    (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧  p_696) -> (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0)
c  in CNF:
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_2
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_1
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨  b^{87, 9}_0
c  in DIMACS:
 18878  18879  18880 -696 -18881 0
 18878  18879  18880 -696 -18882 0
 18878  18879  18880 -696  18883 0

c  1+1 --> 2
c    (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0 ∧  p_696) -> (-b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0)
c  in CNF:
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_2
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨  b^{87, 9}_1
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ -p_696 ∨ -b^{87, 9}_0
c  in DIMACS:
 18878  18879 -18880 -696 -18881 0
 18878  18879 -18880 -696  18882 0
 18878  18879 -18880 -696 -18883 0

c  2+1 --> break 
c    (-b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧  p_696) -> break
c  in CNF:
c     b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 18878 -18879  18880 -696 1162 0


c  2-1 --> 1
c    (-b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧ -p_696) -> (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0)
c  in CNF:
c     b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_2
c     b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_1
c     b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨  b^{87, 9}_0
c  in DIMACS:
 18878 -18879  18880  696 -18881 0
 18878 -18879  18880  696 -18882 0
 18878 -18879  18880  696  18883 0

c  1-1 --> 0
c    (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0 ∧ -p_696) -> (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧ -b^{87, 9}_0)
c  in CNF:
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_2
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_1
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_0
c  in DIMACS:
 18878  18879 -18880  696 -18881 0
 18878  18879 -18880  696 -18882 0
 18878  18879 -18880  696 -18883 0

c  0-1 --> -1
c    (-b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧ -p_696) -> ( b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0)
c  in CNF:
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨  b^{87, 9}_2
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_1
c     b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨  b^{87, 9}_0
c  in DIMACS:
 18878  18879  18880  696  18881 0
 18878  18879  18880  696 -18882 0
 18878  18879  18880  696  18883 0

c  -1-1 --> -2
c    ( b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧  b^{87, 8}_0 ∧ -p_696) -> ( b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0)
c  in CNF:
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨  b^{87, 9}_2
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨  b^{87, 9}_1
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨  p_696 ∨ -b^{87, 9}_0
c  in DIMACS:
-18878  18879 -18880  696  18881 0
-18878  18879 -18880  696  18882 0
-18878  18879 -18880  696 -18883 0

c  -2-1 --> break 
c    ( b^{87, 8}_2 ∧  b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨  b^{87, 8}_0 ∨  p_696 ∨ break
c  in DIMACS:
-18878 -18879  18880  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 8}_2 ∧ -b^{87, 8}_1 ∧ -b^{87, 8}_0 ∧ true) 
c  in CNF:
c    -b^{87, 8}_2 ∨  b^{87, 8}_1 ∨  b^{87, 8}_0 ∨ false 
c  in DIMACS:
-18878  18879  18880  0

c  3 does not represent an automaton state.
c    -(-b^{87, 8}_2 ∧  b^{87, 8}_1 ∧  b^{87, 8}_0 ∧ true) 
c  in CNF:
c     b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ false 
c  in DIMACS:
 18878 -18879 -18880  0
c  -3 does not represent an automaton state.
c    -( b^{87, 8}_2 ∧  b^{87, 8}_1 ∧  b^{87, 8}_0 ∧ true) 
c  in CNF:
c    -b^{87, 8}_2 ∨ -b^{87, 8}_1 ∨ -b^{87, 8}_0 ∨ false 
c  in DIMACS:
-18878 -18879 -18880  0

c i = 9
c  -2+1 --> -1
c    ( b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧  p_783) -> ( b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0)
c  in CNF:
c    -b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨  b^{87, 10}_2
c    -b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_1
c    -b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨  b^{87, 10}_0
c  in DIMACS:
-18881 -18882  18883 -783  18884 0
-18881 -18882  18883 -783 -18885 0
-18881 -18882  18883 -783  18886 0

c  -1+1 --> 0
c    ( b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0 ∧  p_783) -> (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧ -b^{87, 10}_0)
c  in CNF:
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_2
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_1
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_0
c  in DIMACS:
-18881  18882 -18883 -783 -18884 0
-18881  18882 -18883 -783 -18885 0
-18881  18882 -18883 -783 -18886 0

c  0+1 --> 1
c    (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧  p_783) -> (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0)
c  in CNF:
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_2
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_1
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨  b^{87, 10}_0
c  in DIMACS:
 18881  18882  18883 -783 -18884 0
 18881  18882  18883 -783 -18885 0
 18881  18882  18883 -783  18886 0

c  1+1 --> 2
c    (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0 ∧  p_783) -> (-b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0)
c  in CNF:
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_2
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨  b^{87, 10}_1
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ -p_783 ∨ -b^{87, 10}_0
c  in DIMACS:
 18881  18882 -18883 -783 -18884 0
 18881  18882 -18883 -783  18885 0
 18881  18882 -18883 -783 -18886 0

c  2+1 --> break 
c    (-b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧  p_783) -> break
c  in CNF:
c     b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 18881 -18882  18883 -783 1162 0


c  2-1 --> 1
c    (-b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧ -p_783) -> (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0)
c  in CNF:
c     b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_2
c     b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_1
c     b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨  b^{87, 10}_0
c  in DIMACS:
 18881 -18882  18883  783 -18884 0
 18881 -18882  18883  783 -18885 0
 18881 -18882  18883  783  18886 0

c  1-1 --> 0
c    (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0 ∧ -p_783) -> (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧ -b^{87, 10}_0)
c  in CNF:
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_2
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_1
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_0
c  in DIMACS:
 18881  18882 -18883  783 -18884 0
 18881  18882 -18883  783 -18885 0
 18881  18882 -18883  783 -18886 0

c  0-1 --> -1
c    (-b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧ -p_783) -> ( b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0)
c  in CNF:
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨  b^{87, 10}_2
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_1
c     b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨  b^{87, 10}_0
c  in DIMACS:
 18881  18882  18883  783  18884 0
 18881  18882  18883  783 -18885 0
 18881  18882  18883  783  18886 0

c  -1-1 --> -2
c    ( b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧  b^{87, 9}_0 ∧ -p_783) -> ( b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0)
c  in CNF:
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨  b^{87, 10}_2
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨  b^{87, 10}_1
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨  p_783 ∨ -b^{87, 10}_0
c  in DIMACS:
-18881  18882 -18883  783  18884 0
-18881  18882 -18883  783  18885 0
-18881  18882 -18883  783 -18886 0

c  -2-1 --> break 
c    ( b^{87, 9}_2 ∧  b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨  b^{87, 9}_0 ∨  p_783 ∨ break
c  in DIMACS:
-18881 -18882  18883  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 9}_2 ∧ -b^{87, 9}_1 ∧ -b^{87, 9}_0 ∧ true) 
c  in CNF:
c    -b^{87, 9}_2 ∨  b^{87, 9}_1 ∨  b^{87, 9}_0 ∨ false 
c  in DIMACS:
-18881  18882  18883  0

c  3 does not represent an automaton state.
c    -(-b^{87, 9}_2 ∧  b^{87, 9}_1 ∧  b^{87, 9}_0 ∧ true) 
c  in CNF:
c     b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ false 
c  in DIMACS:
 18881 -18882 -18883  0
c  -3 does not represent an automaton state.
c    -( b^{87, 9}_2 ∧  b^{87, 9}_1 ∧  b^{87, 9}_0 ∧ true) 
c  in CNF:
c    -b^{87, 9}_2 ∨ -b^{87, 9}_1 ∨ -b^{87, 9}_0 ∨ false 
c  in DIMACS:
-18881 -18882 -18883  0

c i = 10
c  -2+1 --> -1
c    ( b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧  p_870) -> ( b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0)
c  in CNF:
c    -b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨  b^{87, 11}_2
c    -b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_1
c    -b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨  b^{87, 11}_0
c  in DIMACS:
-18884 -18885  18886 -870  18887 0
-18884 -18885  18886 -870 -18888 0
-18884 -18885  18886 -870  18889 0

c  -1+1 --> 0
c    ( b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0 ∧  p_870) -> (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧ -b^{87, 11}_0)
c  in CNF:
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_2
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_1
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_0
c  in DIMACS:
-18884  18885 -18886 -870 -18887 0
-18884  18885 -18886 -870 -18888 0
-18884  18885 -18886 -870 -18889 0

c  0+1 --> 1
c    (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧  p_870) -> (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0)
c  in CNF:
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_2
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_1
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨  b^{87, 11}_0
c  in DIMACS:
 18884  18885  18886 -870 -18887 0
 18884  18885  18886 -870 -18888 0
 18884  18885  18886 -870  18889 0

c  1+1 --> 2
c    (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0 ∧  p_870) -> (-b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0)
c  in CNF:
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_2
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨  b^{87, 11}_1
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ -p_870 ∨ -b^{87, 11}_0
c  in DIMACS:
 18884  18885 -18886 -870 -18887 0
 18884  18885 -18886 -870  18888 0
 18884  18885 -18886 -870 -18889 0

c  2+1 --> break 
c    (-b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧  p_870) -> break
c  in CNF:
c     b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 18884 -18885  18886 -870 1162 0


c  2-1 --> 1
c    (-b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧ -p_870) -> (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0)
c  in CNF:
c     b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_2
c     b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_1
c     b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨  b^{87, 11}_0
c  in DIMACS:
 18884 -18885  18886  870 -18887 0
 18884 -18885  18886  870 -18888 0
 18884 -18885  18886  870  18889 0

c  1-1 --> 0
c    (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0 ∧ -p_870) -> (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧ -b^{87, 11}_0)
c  in CNF:
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_2
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_1
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_0
c  in DIMACS:
 18884  18885 -18886  870 -18887 0
 18884  18885 -18886  870 -18888 0
 18884  18885 -18886  870 -18889 0

c  0-1 --> -1
c    (-b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧ -p_870) -> ( b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0)
c  in CNF:
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨  b^{87, 11}_2
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_1
c     b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨  b^{87, 11}_0
c  in DIMACS:
 18884  18885  18886  870  18887 0
 18884  18885  18886  870 -18888 0
 18884  18885  18886  870  18889 0

c  -1-1 --> -2
c    ( b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧  b^{87, 10}_0 ∧ -p_870) -> ( b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0)
c  in CNF:
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨  b^{87, 11}_2
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨  b^{87, 11}_1
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨  p_870 ∨ -b^{87, 11}_0
c  in DIMACS:
-18884  18885 -18886  870  18887 0
-18884  18885 -18886  870  18888 0
-18884  18885 -18886  870 -18889 0

c  -2-1 --> break 
c    ( b^{87, 10}_2 ∧  b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨  b^{87, 10}_0 ∨  p_870 ∨ break
c  in DIMACS:
-18884 -18885  18886  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 10}_2 ∧ -b^{87, 10}_1 ∧ -b^{87, 10}_0 ∧ true) 
c  in CNF:
c    -b^{87, 10}_2 ∨  b^{87, 10}_1 ∨  b^{87, 10}_0 ∨ false 
c  in DIMACS:
-18884  18885  18886  0

c  3 does not represent an automaton state.
c    -(-b^{87, 10}_2 ∧  b^{87, 10}_1 ∧  b^{87, 10}_0 ∧ true) 
c  in CNF:
c     b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ false 
c  in DIMACS:
 18884 -18885 -18886  0
c  -3 does not represent an automaton state.
c    -( b^{87, 10}_2 ∧  b^{87, 10}_1 ∧  b^{87, 10}_0 ∧ true) 
c  in CNF:
c    -b^{87, 10}_2 ∨ -b^{87, 10}_1 ∨ -b^{87, 10}_0 ∨ false 
c  in DIMACS:
-18884 -18885 -18886  0

c i = 11
c  -2+1 --> -1
c    ( b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧  p_957) -> ( b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0)
c  in CNF:
c    -b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨  b^{87, 12}_2
c    -b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_1
c    -b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨  b^{87, 12}_0
c  in DIMACS:
-18887 -18888  18889 -957  18890 0
-18887 -18888  18889 -957 -18891 0
-18887 -18888  18889 -957  18892 0

c  -1+1 --> 0
c    ( b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0 ∧  p_957) -> (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧ -b^{87, 12}_0)
c  in CNF:
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_2
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_1
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_0
c  in DIMACS:
-18887  18888 -18889 -957 -18890 0
-18887  18888 -18889 -957 -18891 0
-18887  18888 -18889 -957 -18892 0

c  0+1 --> 1
c    (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧  p_957) -> (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0)
c  in CNF:
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_2
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_1
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨  b^{87, 12}_0
c  in DIMACS:
 18887  18888  18889 -957 -18890 0
 18887  18888  18889 -957 -18891 0
 18887  18888  18889 -957  18892 0

c  1+1 --> 2
c    (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0 ∧  p_957) -> (-b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0)
c  in CNF:
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_2
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨  b^{87, 12}_1
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ -p_957 ∨ -b^{87, 12}_0
c  in DIMACS:
 18887  18888 -18889 -957 -18890 0
 18887  18888 -18889 -957  18891 0
 18887  18888 -18889 -957 -18892 0

c  2+1 --> break 
c    (-b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧  p_957) -> break
c  in CNF:
c     b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 18887 -18888  18889 -957 1162 0


c  2-1 --> 1
c    (-b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧ -p_957) -> (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0)
c  in CNF:
c     b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_2
c     b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_1
c     b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨  b^{87, 12}_0
c  in DIMACS:
 18887 -18888  18889  957 -18890 0
 18887 -18888  18889  957 -18891 0
 18887 -18888  18889  957  18892 0

c  1-1 --> 0
c    (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0 ∧ -p_957) -> (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧ -b^{87, 12}_0)
c  in CNF:
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_2
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_1
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_0
c  in DIMACS:
 18887  18888 -18889  957 -18890 0
 18887  18888 -18889  957 -18891 0
 18887  18888 -18889  957 -18892 0

c  0-1 --> -1
c    (-b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧ -p_957) -> ( b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0)
c  in CNF:
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨  b^{87, 12}_2
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_1
c     b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨  b^{87, 12}_0
c  in DIMACS:
 18887  18888  18889  957  18890 0
 18887  18888  18889  957 -18891 0
 18887  18888  18889  957  18892 0

c  -1-1 --> -2
c    ( b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧  b^{87, 11}_0 ∧ -p_957) -> ( b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0)
c  in CNF:
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨  b^{87, 12}_2
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨  b^{87, 12}_1
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨  p_957 ∨ -b^{87, 12}_0
c  in DIMACS:
-18887  18888 -18889  957  18890 0
-18887  18888 -18889  957  18891 0
-18887  18888 -18889  957 -18892 0

c  -2-1 --> break 
c    ( b^{87, 11}_2 ∧  b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨  b^{87, 11}_0 ∨  p_957 ∨ break
c  in DIMACS:
-18887 -18888  18889  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 11}_2 ∧ -b^{87, 11}_1 ∧ -b^{87, 11}_0 ∧ true) 
c  in CNF:
c    -b^{87, 11}_2 ∨  b^{87, 11}_1 ∨  b^{87, 11}_0 ∨ false 
c  in DIMACS:
-18887  18888  18889  0

c  3 does not represent an automaton state.
c    -(-b^{87, 11}_2 ∧  b^{87, 11}_1 ∧  b^{87, 11}_0 ∧ true) 
c  in CNF:
c     b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ false 
c  in DIMACS:
 18887 -18888 -18889  0
c  -3 does not represent an automaton state.
c    -( b^{87, 11}_2 ∧  b^{87, 11}_1 ∧  b^{87, 11}_0 ∧ true) 
c  in CNF:
c    -b^{87, 11}_2 ∨ -b^{87, 11}_1 ∨ -b^{87, 11}_0 ∨ false 
c  in DIMACS:
-18887 -18888 -18889  0

c i = 12
c  -2+1 --> -1
c    ( b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧  p_1044) -> ( b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0)
c  in CNF:
c    -b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨  b^{87, 13}_2
c    -b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_1
c    -b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨  b^{87, 13}_0
c  in DIMACS:
-18890 -18891  18892 -1044  18893 0
-18890 -18891  18892 -1044 -18894 0
-18890 -18891  18892 -1044  18895 0

c  -1+1 --> 0
c    ( b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0 ∧  p_1044) -> (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧ -b^{87, 13}_0)
c  in CNF:
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_2
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_1
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_0
c  in DIMACS:
-18890  18891 -18892 -1044 -18893 0
-18890  18891 -18892 -1044 -18894 0
-18890  18891 -18892 -1044 -18895 0

c  0+1 --> 1
c    (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧  p_1044) -> (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0)
c  in CNF:
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_2
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_1
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨  b^{87, 13}_0
c  in DIMACS:
 18890  18891  18892 -1044 -18893 0
 18890  18891  18892 -1044 -18894 0
 18890  18891  18892 -1044  18895 0

c  1+1 --> 2
c    (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0 ∧  p_1044) -> (-b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0)
c  in CNF:
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_2
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨  b^{87, 13}_1
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ -p_1044 ∨ -b^{87, 13}_0
c  in DIMACS:
 18890  18891 -18892 -1044 -18893 0
 18890  18891 -18892 -1044  18894 0
 18890  18891 -18892 -1044 -18895 0

c  2+1 --> break 
c    (-b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 18890 -18891  18892 -1044 1162 0


c  2-1 --> 1
c    (-b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧ -p_1044) -> (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0)
c  in CNF:
c     b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_2
c     b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_1
c     b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨  b^{87, 13}_0
c  in DIMACS:
 18890 -18891  18892  1044 -18893 0
 18890 -18891  18892  1044 -18894 0
 18890 -18891  18892  1044  18895 0

c  1-1 --> 0
c    (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0 ∧ -p_1044) -> (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧ -b^{87, 13}_0)
c  in CNF:
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_2
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_1
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_0
c  in DIMACS:
 18890  18891 -18892  1044 -18893 0
 18890  18891 -18892  1044 -18894 0
 18890  18891 -18892  1044 -18895 0

c  0-1 --> -1
c    (-b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧ -p_1044) -> ( b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0)
c  in CNF:
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨  b^{87, 13}_2
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_1
c     b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨  b^{87, 13}_0
c  in DIMACS:
 18890  18891  18892  1044  18893 0
 18890  18891  18892  1044 -18894 0
 18890  18891  18892  1044  18895 0

c  -1-1 --> -2
c    ( b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧  b^{87, 12}_0 ∧ -p_1044) -> ( b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0)
c  in CNF:
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨  b^{87, 13}_2
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨  b^{87, 13}_1
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨  p_1044 ∨ -b^{87, 13}_0
c  in DIMACS:
-18890  18891 -18892  1044  18893 0
-18890  18891 -18892  1044  18894 0
-18890  18891 -18892  1044 -18895 0

c  -2-1 --> break 
c    ( b^{87, 12}_2 ∧  b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨  b^{87, 12}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-18890 -18891  18892  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 12}_2 ∧ -b^{87, 12}_1 ∧ -b^{87, 12}_0 ∧ true) 
c  in CNF:
c    -b^{87, 12}_2 ∨  b^{87, 12}_1 ∨  b^{87, 12}_0 ∨ false 
c  in DIMACS:
-18890  18891  18892  0

c  3 does not represent an automaton state.
c    -(-b^{87, 12}_2 ∧  b^{87, 12}_1 ∧  b^{87, 12}_0 ∧ true) 
c  in CNF:
c     b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ false 
c  in DIMACS:
 18890 -18891 -18892  0
c  -3 does not represent an automaton state.
c    -( b^{87, 12}_2 ∧  b^{87, 12}_1 ∧  b^{87, 12}_0 ∧ true) 
c  in CNF:
c    -b^{87, 12}_2 ∨ -b^{87, 12}_1 ∨ -b^{87, 12}_0 ∨ false 
c  in DIMACS:
-18890 -18891 -18892  0

c i = 13
c  -2+1 --> -1
c    ( b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧  p_1131) -> ( b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧  b^{87, 14}_0)
c  in CNF:
c    -b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨  b^{87, 14}_2
c    -b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_1
c    -b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨  b^{87, 14}_0
c  in DIMACS:
-18893 -18894  18895 -1131  18896 0
-18893 -18894  18895 -1131 -18897 0
-18893 -18894  18895 -1131  18898 0

c  -1+1 --> 0
c    ( b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0 ∧  p_1131) -> (-b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧ -b^{87, 14}_0)
c  in CNF:
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_2
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_1
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_0
c  in DIMACS:
-18893  18894 -18895 -1131 -18896 0
-18893  18894 -18895 -1131 -18897 0
-18893  18894 -18895 -1131 -18898 0

c  0+1 --> 1
c    (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧  p_1131) -> (-b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧  b^{87, 14}_0)
c  in CNF:
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_2
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_1
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨  b^{87, 14}_0
c  in DIMACS:
 18893  18894  18895 -1131 -18896 0
 18893  18894  18895 -1131 -18897 0
 18893  18894  18895 -1131  18898 0

c  1+1 --> 2
c    (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0 ∧  p_1131) -> (-b^{87, 14}_2 ∧  b^{87, 14}_1 ∧ -b^{87, 14}_0)
c  in CNF:
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_2
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨  b^{87, 14}_1
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ -p_1131 ∨ -b^{87, 14}_0
c  in DIMACS:
 18893  18894 -18895 -1131 -18896 0
 18893  18894 -18895 -1131  18897 0
 18893  18894 -18895 -1131 -18898 0

c  2+1 --> break 
c    (-b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 18893 -18894  18895 -1131 1162 0


c  2-1 --> 1
c    (-b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧ -p_1131) -> (-b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧  b^{87, 14}_0)
c  in CNF:
c     b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_2
c     b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_1
c     b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨  b^{87, 14}_0
c  in DIMACS:
 18893 -18894  18895  1131 -18896 0
 18893 -18894  18895  1131 -18897 0
 18893 -18894  18895  1131  18898 0

c  1-1 --> 0
c    (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0 ∧ -p_1131) -> (-b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧ -b^{87, 14}_0)
c  in CNF:
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_2
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_1
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_0
c  in DIMACS:
 18893  18894 -18895  1131 -18896 0
 18893  18894 -18895  1131 -18897 0
 18893  18894 -18895  1131 -18898 0

c  0-1 --> -1
c    (-b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧ -p_1131) -> ( b^{87, 14}_2 ∧ -b^{87, 14}_1 ∧  b^{87, 14}_0)
c  in CNF:
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨  b^{87, 14}_2
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_1
c     b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨  b^{87, 14}_0
c  in DIMACS:
 18893  18894  18895  1131  18896 0
 18893  18894  18895  1131 -18897 0
 18893  18894  18895  1131  18898 0

c  -1-1 --> -2
c    ( b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧  b^{87, 13}_0 ∧ -p_1131) -> ( b^{87, 14}_2 ∧  b^{87, 14}_1 ∧ -b^{87, 14}_0)
c  in CNF:
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨  b^{87, 14}_2
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨  b^{87, 14}_1
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨  p_1131 ∨ -b^{87, 14}_0
c  in DIMACS:
-18893  18894 -18895  1131  18896 0
-18893  18894 -18895  1131  18897 0
-18893  18894 -18895  1131 -18898 0

c  -2-1 --> break 
c    ( b^{87, 13}_2 ∧  b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨  b^{87, 13}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-18893 -18894  18895  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{87, 13}_2 ∧ -b^{87, 13}_1 ∧ -b^{87, 13}_0 ∧ true) 
c  in CNF:
c    -b^{87, 13}_2 ∨  b^{87, 13}_1 ∨  b^{87, 13}_0 ∨ false 
c  in DIMACS:
-18893  18894  18895  0

c  3 does not represent an automaton state.
c    -(-b^{87, 13}_2 ∧  b^{87, 13}_1 ∧  b^{87, 13}_0 ∧ true) 
c  in CNF:
c     b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ false 
c  in DIMACS:
 18893 -18894 -18895  0
c  -3 does not represent an automaton state.
c    -( b^{87, 13}_2 ∧  b^{87, 13}_1 ∧  b^{87, 13}_0 ∧ true) 
c  in CNF:
c    -b^{87, 13}_2 ∨ -b^{87, 13}_1 ∨ -b^{87, 13}_0 ∨ false 
c  in DIMACS:
-18893 -18894 -18895  0

c INIT for k = 88
c    -b^{88, 1}_2
c    -b^{88, 1}_1
c    -b^{88, 1}_0
c  in DIMACS:
-18899 0
-18900 0
-18901 0

c Transitions for k = 88
c i = 1
c  -2+1 --> -1
c    ( b^{88, 1}_2 ∧  b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧  p_88) -> ( b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0)
c  in CNF:
c    -b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨  b^{88, 2}_2
c    -b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_1
c    -b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨  b^{88, 2}_0
c  in DIMACS:
-18899 -18900  18901 -88  18902 0
-18899 -18900  18901 -88 -18903 0
-18899 -18900  18901 -88  18904 0

c  -1+1 --> 0
c    ( b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧  b^{88, 1}_0 ∧  p_88) -> (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧ -b^{88, 2}_0)
c  in CNF:
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_2
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_1
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_0
c  in DIMACS:
-18899  18900 -18901 -88 -18902 0
-18899  18900 -18901 -88 -18903 0
-18899  18900 -18901 -88 -18904 0

c  0+1 --> 1
c    (-b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧  p_88) -> (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0)
c  in CNF:
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_2
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_1
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨  b^{88, 2}_0
c  in DIMACS:
 18899  18900  18901 -88 -18902 0
 18899  18900  18901 -88 -18903 0
 18899  18900  18901 -88  18904 0

c  1+1 --> 2
c    (-b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧  b^{88, 1}_0 ∧  p_88) -> (-b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0)
c  in CNF:
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_2
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨  b^{88, 2}_1
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ -p_88 ∨ -b^{88, 2}_0
c  in DIMACS:
 18899  18900 -18901 -88 -18902 0
 18899  18900 -18901 -88  18903 0
 18899  18900 -18901 -88 -18904 0

c  2+1 --> break 
c    (-b^{88, 1}_2 ∧  b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧  p_88) -> break
c  in CNF:
c     b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ -p_88 ∨ break
c  in DIMACS:
 18899 -18900  18901 -88 1162 0


c  2-1 --> 1
c    (-b^{88, 1}_2 ∧  b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧ -p_88) -> (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0)
c  in CNF:
c     b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_2
c     b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_1
c     b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨  b^{88, 2}_0
c  in DIMACS:
 18899 -18900  18901  88 -18902 0
 18899 -18900  18901  88 -18903 0
 18899 -18900  18901  88  18904 0

c  1-1 --> 0
c    (-b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧  b^{88, 1}_0 ∧ -p_88) -> (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧ -b^{88, 2}_0)
c  in CNF:
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_2
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_1
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_0
c  in DIMACS:
 18899  18900 -18901  88 -18902 0
 18899  18900 -18901  88 -18903 0
 18899  18900 -18901  88 -18904 0

c  0-1 --> -1
c    (-b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧ -p_88) -> ( b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0)
c  in CNF:
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨  b^{88, 2}_2
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_1
c     b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨  b^{88, 2}_0
c  in DIMACS:
 18899  18900  18901  88  18902 0
 18899  18900  18901  88 -18903 0
 18899  18900  18901  88  18904 0

c  -1-1 --> -2
c    ( b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧  b^{88, 1}_0 ∧ -p_88) -> ( b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0)
c  in CNF:
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨  b^{88, 2}_2
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨  b^{88, 2}_1
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨  p_88 ∨ -b^{88, 2}_0
c  in DIMACS:
-18899  18900 -18901  88  18902 0
-18899  18900 -18901  88  18903 0
-18899  18900 -18901  88 -18904 0

c  -2-1 --> break 
c    ( b^{88, 1}_2 ∧  b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧ -p_88) -> break
c  in CNF:
c    -b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨  b^{88, 1}_0 ∨  p_88 ∨ break
c  in DIMACS:
-18899 -18900  18901  88 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 1}_2 ∧ -b^{88, 1}_1 ∧ -b^{88, 1}_0 ∧ true) 
c  in CNF:
c    -b^{88, 1}_2 ∨  b^{88, 1}_1 ∨  b^{88, 1}_0 ∨ false 
c  in DIMACS:
-18899  18900  18901  0

c  3 does not represent an automaton state.
c    -(-b^{88, 1}_2 ∧  b^{88, 1}_1 ∧  b^{88, 1}_0 ∧ true) 
c  in CNF:
c     b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ false 
c  in DIMACS:
 18899 -18900 -18901  0
c  -3 does not represent an automaton state.
c    -( b^{88, 1}_2 ∧  b^{88, 1}_1 ∧  b^{88, 1}_0 ∧ true) 
c  in CNF:
c    -b^{88, 1}_2 ∨ -b^{88, 1}_1 ∨ -b^{88, 1}_0 ∨ false 
c  in DIMACS:
-18899 -18900 -18901  0

c i = 2
c  -2+1 --> -1
c    ( b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧  p_176) -> ( b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0)
c  in CNF:
c    -b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨  b^{88, 3}_2
c    -b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_1
c    -b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨  b^{88, 3}_0
c  in DIMACS:
-18902 -18903  18904 -176  18905 0
-18902 -18903  18904 -176 -18906 0
-18902 -18903  18904 -176  18907 0

c  -1+1 --> 0
c    ( b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0 ∧  p_176) -> (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧ -b^{88, 3}_0)
c  in CNF:
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_2
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_1
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_0
c  in DIMACS:
-18902  18903 -18904 -176 -18905 0
-18902  18903 -18904 -176 -18906 0
-18902  18903 -18904 -176 -18907 0

c  0+1 --> 1
c    (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧  p_176) -> (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0)
c  in CNF:
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_2
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_1
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨  b^{88, 3}_0
c  in DIMACS:
 18902  18903  18904 -176 -18905 0
 18902  18903  18904 -176 -18906 0
 18902  18903  18904 -176  18907 0

c  1+1 --> 2
c    (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0 ∧  p_176) -> (-b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0)
c  in CNF:
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_2
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨  b^{88, 3}_1
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ -p_176 ∨ -b^{88, 3}_0
c  in DIMACS:
 18902  18903 -18904 -176 -18905 0
 18902  18903 -18904 -176  18906 0
 18902  18903 -18904 -176 -18907 0

c  2+1 --> break 
c    (-b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧  p_176) -> break
c  in CNF:
c     b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 18902 -18903  18904 -176 1162 0


c  2-1 --> 1
c    (-b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧ -p_176) -> (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0)
c  in CNF:
c     b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_2
c     b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_1
c     b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨  b^{88, 3}_0
c  in DIMACS:
 18902 -18903  18904  176 -18905 0
 18902 -18903  18904  176 -18906 0
 18902 -18903  18904  176  18907 0

c  1-1 --> 0
c    (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0 ∧ -p_176) -> (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧ -b^{88, 3}_0)
c  in CNF:
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_2
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_1
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_0
c  in DIMACS:
 18902  18903 -18904  176 -18905 0
 18902  18903 -18904  176 -18906 0
 18902  18903 -18904  176 -18907 0

c  0-1 --> -1
c    (-b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧ -p_176) -> ( b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0)
c  in CNF:
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨  b^{88, 3}_2
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_1
c     b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨  b^{88, 3}_0
c  in DIMACS:
 18902  18903  18904  176  18905 0
 18902  18903  18904  176 -18906 0
 18902  18903  18904  176  18907 0

c  -1-1 --> -2
c    ( b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧  b^{88, 2}_0 ∧ -p_176) -> ( b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0)
c  in CNF:
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨  b^{88, 3}_2
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨  b^{88, 3}_1
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨  p_176 ∨ -b^{88, 3}_0
c  in DIMACS:
-18902  18903 -18904  176  18905 0
-18902  18903 -18904  176  18906 0
-18902  18903 -18904  176 -18907 0

c  -2-1 --> break 
c    ( b^{88, 2}_2 ∧  b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨  b^{88, 2}_0 ∨  p_176 ∨ break
c  in DIMACS:
-18902 -18903  18904  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 2}_2 ∧ -b^{88, 2}_1 ∧ -b^{88, 2}_0 ∧ true) 
c  in CNF:
c    -b^{88, 2}_2 ∨  b^{88, 2}_1 ∨  b^{88, 2}_0 ∨ false 
c  in DIMACS:
-18902  18903  18904  0

c  3 does not represent an automaton state.
c    -(-b^{88, 2}_2 ∧  b^{88, 2}_1 ∧  b^{88, 2}_0 ∧ true) 
c  in CNF:
c     b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ false 
c  in DIMACS:
 18902 -18903 -18904  0
c  -3 does not represent an automaton state.
c    -( b^{88, 2}_2 ∧  b^{88, 2}_1 ∧  b^{88, 2}_0 ∧ true) 
c  in CNF:
c    -b^{88, 2}_2 ∨ -b^{88, 2}_1 ∨ -b^{88, 2}_0 ∨ false 
c  in DIMACS:
-18902 -18903 -18904  0

c i = 3
c  -2+1 --> -1
c    ( b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧  p_264) -> ( b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0)
c  in CNF:
c    -b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨  b^{88, 4}_2
c    -b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_1
c    -b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨  b^{88, 4}_0
c  in DIMACS:
-18905 -18906  18907 -264  18908 0
-18905 -18906  18907 -264 -18909 0
-18905 -18906  18907 -264  18910 0

c  -1+1 --> 0
c    ( b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0 ∧  p_264) -> (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧ -b^{88, 4}_0)
c  in CNF:
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_2
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_1
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_0
c  in DIMACS:
-18905  18906 -18907 -264 -18908 0
-18905  18906 -18907 -264 -18909 0
-18905  18906 -18907 -264 -18910 0

c  0+1 --> 1
c    (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧  p_264) -> (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0)
c  in CNF:
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_2
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_1
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨  b^{88, 4}_0
c  in DIMACS:
 18905  18906  18907 -264 -18908 0
 18905  18906  18907 -264 -18909 0
 18905  18906  18907 -264  18910 0

c  1+1 --> 2
c    (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0 ∧  p_264) -> (-b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0)
c  in CNF:
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_2
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨  b^{88, 4}_1
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ -p_264 ∨ -b^{88, 4}_0
c  in DIMACS:
 18905  18906 -18907 -264 -18908 0
 18905  18906 -18907 -264  18909 0
 18905  18906 -18907 -264 -18910 0

c  2+1 --> break 
c    (-b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧  p_264) -> break
c  in CNF:
c     b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 18905 -18906  18907 -264 1162 0


c  2-1 --> 1
c    (-b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧ -p_264) -> (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0)
c  in CNF:
c     b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_2
c     b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_1
c     b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨  b^{88, 4}_0
c  in DIMACS:
 18905 -18906  18907  264 -18908 0
 18905 -18906  18907  264 -18909 0
 18905 -18906  18907  264  18910 0

c  1-1 --> 0
c    (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0 ∧ -p_264) -> (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧ -b^{88, 4}_0)
c  in CNF:
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_2
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_1
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_0
c  in DIMACS:
 18905  18906 -18907  264 -18908 0
 18905  18906 -18907  264 -18909 0
 18905  18906 -18907  264 -18910 0

c  0-1 --> -1
c    (-b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧ -p_264) -> ( b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0)
c  in CNF:
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨  b^{88, 4}_2
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_1
c     b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨  b^{88, 4}_0
c  in DIMACS:
 18905  18906  18907  264  18908 0
 18905  18906  18907  264 -18909 0
 18905  18906  18907  264  18910 0

c  -1-1 --> -2
c    ( b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧  b^{88, 3}_0 ∧ -p_264) -> ( b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0)
c  in CNF:
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨  b^{88, 4}_2
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨  b^{88, 4}_1
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨  p_264 ∨ -b^{88, 4}_0
c  in DIMACS:
-18905  18906 -18907  264  18908 0
-18905  18906 -18907  264  18909 0
-18905  18906 -18907  264 -18910 0

c  -2-1 --> break 
c    ( b^{88, 3}_2 ∧  b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨  b^{88, 3}_0 ∨  p_264 ∨ break
c  in DIMACS:
-18905 -18906  18907  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 3}_2 ∧ -b^{88, 3}_1 ∧ -b^{88, 3}_0 ∧ true) 
c  in CNF:
c    -b^{88, 3}_2 ∨  b^{88, 3}_1 ∨  b^{88, 3}_0 ∨ false 
c  in DIMACS:
-18905  18906  18907  0

c  3 does not represent an automaton state.
c    -(-b^{88, 3}_2 ∧  b^{88, 3}_1 ∧  b^{88, 3}_0 ∧ true) 
c  in CNF:
c     b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ false 
c  in DIMACS:
 18905 -18906 -18907  0
c  -3 does not represent an automaton state.
c    -( b^{88, 3}_2 ∧  b^{88, 3}_1 ∧  b^{88, 3}_0 ∧ true) 
c  in CNF:
c    -b^{88, 3}_2 ∨ -b^{88, 3}_1 ∨ -b^{88, 3}_0 ∨ false 
c  in DIMACS:
-18905 -18906 -18907  0

c i = 4
c  -2+1 --> -1
c    ( b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧  p_352) -> ( b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0)
c  in CNF:
c    -b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨  b^{88, 5}_2
c    -b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_1
c    -b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨  b^{88, 5}_0
c  in DIMACS:
-18908 -18909  18910 -352  18911 0
-18908 -18909  18910 -352 -18912 0
-18908 -18909  18910 -352  18913 0

c  -1+1 --> 0
c    ( b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0 ∧  p_352) -> (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧ -b^{88, 5}_0)
c  in CNF:
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_2
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_1
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_0
c  in DIMACS:
-18908  18909 -18910 -352 -18911 0
-18908  18909 -18910 -352 -18912 0
-18908  18909 -18910 -352 -18913 0

c  0+1 --> 1
c    (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧  p_352) -> (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0)
c  in CNF:
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_2
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_1
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨  b^{88, 5}_0
c  in DIMACS:
 18908  18909  18910 -352 -18911 0
 18908  18909  18910 -352 -18912 0
 18908  18909  18910 -352  18913 0

c  1+1 --> 2
c    (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0 ∧  p_352) -> (-b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0)
c  in CNF:
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_2
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨  b^{88, 5}_1
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ -p_352 ∨ -b^{88, 5}_0
c  in DIMACS:
 18908  18909 -18910 -352 -18911 0
 18908  18909 -18910 -352  18912 0
 18908  18909 -18910 -352 -18913 0

c  2+1 --> break 
c    (-b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧  p_352) -> break
c  in CNF:
c     b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 18908 -18909  18910 -352 1162 0


c  2-1 --> 1
c    (-b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧ -p_352) -> (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0)
c  in CNF:
c     b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_2
c     b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_1
c     b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨  b^{88, 5}_0
c  in DIMACS:
 18908 -18909  18910  352 -18911 0
 18908 -18909  18910  352 -18912 0
 18908 -18909  18910  352  18913 0

c  1-1 --> 0
c    (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0 ∧ -p_352) -> (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧ -b^{88, 5}_0)
c  in CNF:
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_2
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_1
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_0
c  in DIMACS:
 18908  18909 -18910  352 -18911 0
 18908  18909 -18910  352 -18912 0
 18908  18909 -18910  352 -18913 0

c  0-1 --> -1
c    (-b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧ -p_352) -> ( b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0)
c  in CNF:
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨  b^{88, 5}_2
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_1
c     b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨  b^{88, 5}_0
c  in DIMACS:
 18908  18909  18910  352  18911 0
 18908  18909  18910  352 -18912 0
 18908  18909  18910  352  18913 0

c  -1-1 --> -2
c    ( b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧  b^{88, 4}_0 ∧ -p_352) -> ( b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0)
c  in CNF:
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨  b^{88, 5}_2
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨  b^{88, 5}_1
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨  p_352 ∨ -b^{88, 5}_0
c  in DIMACS:
-18908  18909 -18910  352  18911 0
-18908  18909 -18910  352  18912 0
-18908  18909 -18910  352 -18913 0

c  -2-1 --> break 
c    ( b^{88, 4}_2 ∧  b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨  b^{88, 4}_0 ∨  p_352 ∨ break
c  in DIMACS:
-18908 -18909  18910  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 4}_2 ∧ -b^{88, 4}_1 ∧ -b^{88, 4}_0 ∧ true) 
c  in CNF:
c    -b^{88, 4}_2 ∨  b^{88, 4}_1 ∨  b^{88, 4}_0 ∨ false 
c  in DIMACS:
-18908  18909  18910  0

c  3 does not represent an automaton state.
c    -(-b^{88, 4}_2 ∧  b^{88, 4}_1 ∧  b^{88, 4}_0 ∧ true) 
c  in CNF:
c     b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ false 
c  in DIMACS:
 18908 -18909 -18910  0
c  -3 does not represent an automaton state.
c    -( b^{88, 4}_2 ∧  b^{88, 4}_1 ∧  b^{88, 4}_0 ∧ true) 
c  in CNF:
c    -b^{88, 4}_2 ∨ -b^{88, 4}_1 ∨ -b^{88, 4}_0 ∨ false 
c  in DIMACS:
-18908 -18909 -18910  0

c i = 5
c  -2+1 --> -1
c    ( b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧  p_440) -> ( b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0)
c  in CNF:
c    -b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨  b^{88, 6}_2
c    -b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_1
c    -b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨  b^{88, 6}_0
c  in DIMACS:
-18911 -18912  18913 -440  18914 0
-18911 -18912  18913 -440 -18915 0
-18911 -18912  18913 -440  18916 0

c  -1+1 --> 0
c    ( b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0 ∧  p_440) -> (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧ -b^{88, 6}_0)
c  in CNF:
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_2
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_1
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_0
c  in DIMACS:
-18911  18912 -18913 -440 -18914 0
-18911  18912 -18913 -440 -18915 0
-18911  18912 -18913 -440 -18916 0

c  0+1 --> 1
c    (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧  p_440) -> (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0)
c  in CNF:
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_2
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_1
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨  b^{88, 6}_0
c  in DIMACS:
 18911  18912  18913 -440 -18914 0
 18911  18912  18913 -440 -18915 0
 18911  18912  18913 -440  18916 0

c  1+1 --> 2
c    (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0 ∧  p_440) -> (-b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0)
c  in CNF:
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_2
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨  b^{88, 6}_1
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ -p_440 ∨ -b^{88, 6}_0
c  in DIMACS:
 18911  18912 -18913 -440 -18914 0
 18911  18912 -18913 -440  18915 0
 18911  18912 -18913 -440 -18916 0

c  2+1 --> break 
c    (-b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧  p_440) -> break
c  in CNF:
c     b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 18911 -18912  18913 -440 1162 0


c  2-1 --> 1
c    (-b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧ -p_440) -> (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0)
c  in CNF:
c     b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_2
c     b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_1
c     b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨  b^{88, 6}_0
c  in DIMACS:
 18911 -18912  18913  440 -18914 0
 18911 -18912  18913  440 -18915 0
 18911 -18912  18913  440  18916 0

c  1-1 --> 0
c    (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0 ∧ -p_440) -> (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧ -b^{88, 6}_0)
c  in CNF:
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_2
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_1
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_0
c  in DIMACS:
 18911  18912 -18913  440 -18914 0
 18911  18912 -18913  440 -18915 0
 18911  18912 -18913  440 -18916 0

c  0-1 --> -1
c    (-b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧ -p_440) -> ( b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0)
c  in CNF:
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨  b^{88, 6}_2
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_1
c     b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨  b^{88, 6}_0
c  in DIMACS:
 18911  18912  18913  440  18914 0
 18911  18912  18913  440 -18915 0
 18911  18912  18913  440  18916 0

c  -1-1 --> -2
c    ( b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧  b^{88, 5}_0 ∧ -p_440) -> ( b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0)
c  in CNF:
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨  b^{88, 6}_2
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨  b^{88, 6}_1
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨  p_440 ∨ -b^{88, 6}_0
c  in DIMACS:
-18911  18912 -18913  440  18914 0
-18911  18912 -18913  440  18915 0
-18911  18912 -18913  440 -18916 0

c  -2-1 --> break 
c    ( b^{88, 5}_2 ∧  b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨  b^{88, 5}_0 ∨  p_440 ∨ break
c  in DIMACS:
-18911 -18912  18913  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 5}_2 ∧ -b^{88, 5}_1 ∧ -b^{88, 5}_0 ∧ true) 
c  in CNF:
c    -b^{88, 5}_2 ∨  b^{88, 5}_1 ∨  b^{88, 5}_0 ∨ false 
c  in DIMACS:
-18911  18912  18913  0

c  3 does not represent an automaton state.
c    -(-b^{88, 5}_2 ∧  b^{88, 5}_1 ∧  b^{88, 5}_0 ∧ true) 
c  in CNF:
c     b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ false 
c  in DIMACS:
 18911 -18912 -18913  0
c  -3 does not represent an automaton state.
c    -( b^{88, 5}_2 ∧  b^{88, 5}_1 ∧  b^{88, 5}_0 ∧ true) 
c  in CNF:
c    -b^{88, 5}_2 ∨ -b^{88, 5}_1 ∨ -b^{88, 5}_0 ∨ false 
c  in DIMACS:
-18911 -18912 -18913  0

c i = 6
c  -2+1 --> -1
c    ( b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧  p_528) -> ( b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0)
c  in CNF:
c    -b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨  b^{88, 7}_2
c    -b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_1
c    -b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨  b^{88, 7}_0
c  in DIMACS:
-18914 -18915  18916 -528  18917 0
-18914 -18915  18916 -528 -18918 0
-18914 -18915  18916 -528  18919 0

c  -1+1 --> 0
c    ( b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0 ∧  p_528) -> (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧ -b^{88, 7}_0)
c  in CNF:
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_2
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_1
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_0
c  in DIMACS:
-18914  18915 -18916 -528 -18917 0
-18914  18915 -18916 -528 -18918 0
-18914  18915 -18916 -528 -18919 0

c  0+1 --> 1
c    (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧  p_528) -> (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0)
c  in CNF:
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_2
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_1
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨  b^{88, 7}_0
c  in DIMACS:
 18914  18915  18916 -528 -18917 0
 18914  18915  18916 -528 -18918 0
 18914  18915  18916 -528  18919 0

c  1+1 --> 2
c    (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0 ∧  p_528) -> (-b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0)
c  in CNF:
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_2
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨  b^{88, 7}_1
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ -p_528 ∨ -b^{88, 7}_0
c  in DIMACS:
 18914  18915 -18916 -528 -18917 0
 18914  18915 -18916 -528  18918 0
 18914  18915 -18916 -528 -18919 0

c  2+1 --> break 
c    (-b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧  p_528) -> break
c  in CNF:
c     b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 18914 -18915  18916 -528 1162 0


c  2-1 --> 1
c    (-b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧ -p_528) -> (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0)
c  in CNF:
c     b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_2
c     b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_1
c     b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨  b^{88, 7}_0
c  in DIMACS:
 18914 -18915  18916  528 -18917 0
 18914 -18915  18916  528 -18918 0
 18914 -18915  18916  528  18919 0

c  1-1 --> 0
c    (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0 ∧ -p_528) -> (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧ -b^{88, 7}_0)
c  in CNF:
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_2
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_1
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_0
c  in DIMACS:
 18914  18915 -18916  528 -18917 0
 18914  18915 -18916  528 -18918 0
 18914  18915 -18916  528 -18919 0

c  0-1 --> -1
c    (-b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧ -p_528) -> ( b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0)
c  in CNF:
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨  b^{88, 7}_2
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_1
c     b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨  b^{88, 7}_0
c  in DIMACS:
 18914  18915  18916  528  18917 0
 18914  18915  18916  528 -18918 0
 18914  18915  18916  528  18919 0

c  -1-1 --> -2
c    ( b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧  b^{88, 6}_0 ∧ -p_528) -> ( b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0)
c  in CNF:
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨  b^{88, 7}_2
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨  b^{88, 7}_1
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨  p_528 ∨ -b^{88, 7}_0
c  in DIMACS:
-18914  18915 -18916  528  18917 0
-18914  18915 -18916  528  18918 0
-18914  18915 -18916  528 -18919 0

c  -2-1 --> break 
c    ( b^{88, 6}_2 ∧  b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨  b^{88, 6}_0 ∨  p_528 ∨ break
c  in DIMACS:
-18914 -18915  18916  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 6}_2 ∧ -b^{88, 6}_1 ∧ -b^{88, 6}_0 ∧ true) 
c  in CNF:
c    -b^{88, 6}_2 ∨  b^{88, 6}_1 ∨  b^{88, 6}_0 ∨ false 
c  in DIMACS:
-18914  18915  18916  0

c  3 does not represent an automaton state.
c    -(-b^{88, 6}_2 ∧  b^{88, 6}_1 ∧  b^{88, 6}_0 ∧ true) 
c  in CNF:
c     b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ false 
c  in DIMACS:
 18914 -18915 -18916  0
c  -3 does not represent an automaton state.
c    -( b^{88, 6}_2 ∧  b^{88, 6}_1 ∧  b^{88, 6}_0 ∧ true) 
c  in CNF:
c    -b^{88, 6}_2 ∨ -b^{88, 6}_1 ∨ -b^{88, 6}_0 ∨ false 
c  in DIMACS:
-18914 -18915 -18916  0

c i = 7
c  -2+1 --> -1
c    ( b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧  p_616) -> ( b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0)
c  in CNF:
c    -b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨  b^{88, 8}_2
c    -b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_1
c    -b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨  b^{88, 8}_0
c  in DIMACS:
-18917 -18918  18919 -616  18920 0
-18917 -18918  18919 -616 -18921 0
-18917 -18918  18919 -616  18922 0

c  -1+1 --> 0
c    ( b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0 ∧  p_616) -> (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧ -b^{88, 8}_0)
c  in CNF:
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_2
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_1
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_0
c  in DIMACS:
-18917  18918 -18919 -616 -18920 0
-18917  18918 -18919 -616 -18921 0
-18917  18918 -18919 -616 -18922 0

c  0+1 --> 1
c    (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧  p_616) -> (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0)
c  in CNF:
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_2
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_1
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨  b^{88, 8}_0
c  in DIMACS:
 18917  18918  18919 -616 -18920 0
 18917  18918  18919 -616 -18921 0
 18917  18918  18919 -616  18922 0

c  1+1 --> 2
c    (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0 ∧  p_616) -> (-b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0)
c  in CNF:
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_2
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨  b^{88, 8}_1
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ -p_616 ∨ -b^{88, 8}_0
c  in DIMACS:
 18917  18918 -18919 -616 -18920 0
 18917  18918 -18919 -616  18921 0
 18917  18918 -18919 -616 -18922 0

c  2+1 --> break 
c    (-b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧  p_616) -> break
c  in CNF:
c     b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 18917 -18918  18919 -616 1162 0


c  2-1 --> 1
c    (-b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧ -p_616) -> (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0)
c  in CNF:
c     b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_2
c     b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_1
c     b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨  b^{88, 8}_0
c  in DIMACS:
 18917 -18918  18919  616 -18920 0
 18917 -18918  18919  616 -18921 0
 18917 -18918  18919  616  18922 0

c  1-1 --> 0
c    (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0 ∧ -p_616) -> (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧ -b^{88, 8}_0)
c  in CNF:
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_2
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_1
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_0
c  in DIMACS:
 18917  18918 -18919  616 -18920 0
 18917  18918 -18919  616 -18921 0
 18917  18918 -18919  616 -18922 0

c  0-1 --> -1
c    (-b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧ -p_616) -> ( b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0)
c  in CNF:
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨  b^{88, 8}_2
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_1
c     b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨  b^{88, 8}_0
c  in DIMACS:
 18917  18918  18919  616  18920 0
 18917  18918  18919  616 -18921 0
 18917  18918  18919  616  18922 0

c  -1-1 --> -2
c    ( b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧  b^{88, 7}_0 ∧ -p_616) -> ( b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0)
c  in CNF:
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨  b^{88, 8}_2
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨  b^{88, 8}_1
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨  p_616 ∨ -b^{88, 8}_0
c  in DIMACS:
-18917  18918 -18919  616  18920 0
-18917  18918 -18919  616  18921 0
-18917  18918 -18919  616 -18922 0

c  -2-1 --> break 
c    ( b^{88, 7}_2 ∧  b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨  b^{88, 7}_0 ∨  p_616 ∨ break
c  in DIMACS:
-18917 -18918  18919  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 7}_2 ∧ -b^{88, 7}_1 ∧ -b^{88, 7}_0 ∧ true) 
c  in CNF:
c    -b^{88, 7}_2 ∨  b^{88, 7}_1 ∨  b^{88, 7}_0 ∨ false 
c  in DIMACS:
-18917  18918  18919  0

c  3 does not represent an automaton state.
c    -(-b^{88, 7}_2 ∧  b^{88, 7}_1 ∧  b^{88, 7}_0 ∧ true) 
c  in CNF:
c     b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ false 
c  in DIMACS:
 18917 -18918 -18919  0
c  -3 does not represent an automaton state.
c    -( b^{88, 7}_2 ∧  b^{88, 7}_1 ∧  b^{88, 7}_0 ∧ true) 
c  in CNF:
c    -b^{88, 7}_2 ∨ -b^{88, 7}_1 ∨ -b^{88, 7}_0 ∨ false 
c  in DIMACS:
-18917 -18918 -18919  0

c i = 8
c  -2+1 --> -1
c    ( b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧  p_704) -> ( b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0)
c  in CNF:
c    -b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨  b^{88, 9}_2
c    -b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_1
c    -b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨  b^{88, 9}_0
c  in DIMACS:
-18920 -18921  18922 -704  18923 0
-18920 -18921  18922 -704 -18924 0
-18920 -18921  18922 -704  18925 0

c  -1+1 --> 0
c    ( b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0 ∧  p_704) -> (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧ -b^{88, 9}_0)
c  in CNF:
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_2
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_1
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_0
c  in DIMACS:
-18920  18921 -18922 -704 -18923 0
-18920  18921 -18922 -704 -18924 0
-18920  18921 -18922 -704 -18925 0

c  0+1 --> 1
c    (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧  p_704) -> (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0)
c  in CNF:
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_2
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_1
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨  b^{88, 9}_0
c  in DIMACS:
 18920  18921  18922 -704 -18923 0
 18920  18921  18922 -704 -18924 0
 18920  18921  18922 -704  18925 0

c  1+1 --> 2
c    (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0 ∧  p_704) -> (-b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0)
c  in CNF:
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_2
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨  b^{88, 9}_1
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ -p_704 ∨ -b^{88, 9}_0
c  in DIMACS:
 18920  18921 -18922 -704 -18923 0
 18920  18921 -18922 -704  18924 0
 18920  18921 -18922 -704 -18925 0

c  2+1 --> break 
c    (-b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧  p_704) -> break
c  in CNF:
c     b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 18920 -18921  18922 -704 1162 0


c  2-1 --> 1
c    (-b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧ -p_704) -> (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0)
c  in CNF:
c     b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_2
c     b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_1
c     b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨  b^{88, 9}_0
c  in DIMACS:
 18920 -18921  18922  704 -18923 0
 18920 -18921  18922  704 -18924 0
 18920 -18921  18922  704  18925 0

c  1-1 --> 0
c    (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0 ∧ -p_704) -> (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧ -b^{88, 9}_0)
c  in CNF:
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_2
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_1
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_0
c  in DIMACS:
 18920  18921 -18922  704 -18923 0
 18920  18921 -18922  704 -18924 0
 18920  18921 -18922  704 -18925 0

c  0-1 --> -1
c    (-b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧ -p_704) -> ( b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0)
c  in CNF:
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨  b^{88, 9}_2
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_1
c     b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨  b^{88, 9}_0
c  in DIMACS:
 18920  18921  18922  704  18923 0
 18920  18921  18922  704 -18924 0
 18920  18921  18922  704  18925 0

c  -1-1 --> -2
c    ( b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧  b^{88, 8}_0 ∧ -p_704) -> ( b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0)
c  in CNF:
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨  b^{88, 9}_2
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨  b^{88, 9}_1
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨  p_704 ∨ -b^{88, 9}_0
c  in DIMACS:
-18920  18921 -18922  704  18923 0
-18920  18921 -18922  704  18924 0
-18920  18921 -18922  704 -18925 0

c  -2-1 --> break 
c    ( b^{88, 8}_2 ∧  b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨  b^{88, 8}_0 ∨  p_704 ∨ break
c  in DIMACS:
-18920 -18921  18922  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 8}_2 ∧ -b^{88, 8}_1 ∧ -b^{88, 8}_0 ∧ true) 
c  in CNF:
c    -b^{88, 8}_2 ∨  b^{88, 8}_1 ∨  b^{88, 8}_0 ∨ false 
c  in DIMACS:
-18920  18921  18922  0

c  3 does not represent an automaton state.
c    -(-b^{88, 8}_2 ∧  b^{88, 8}_1 ∧  b^{88, 8}_0 ∧ true) 
c  in CNF:
c     b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ false 
c  in DIMACS:
 18920 -18921 -18922  0
c  -3 does not represent an automaton state.
c    -( b^{88, 8}_2 ∧  b^{88, 8}_1 ∧  b^{88, 8}_0 ∧ true) 
c  in CNF:
c    -b^{88, 8}_2 ∨ -b^{88, 8}_1 ∨ -b^{88, 8}_0 ∨ false 
c  in DIMACS:
-18920 -18921 -18922  0

c i = 9
c  -2+1 --> -1
c    ( b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧  p_792) -> ( b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0)
c  in CNF:
c    -b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨  b^{88, 10}_2
c    -b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_1
c    -b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨  b^{88, 10}_0
c  in DIMACS:
-18923 -18924  18925 -792  18926 0
-18923 -18924  18925 -792 -18927 0
-18923 -18924  18925 -792  18928 0

c  -1+1 --> 0
c    ( b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0 ∧  p_792) -> (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧ -b^{88, 10}_0)
c  in CNF:
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_2
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_1
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_0
c  in DIMACS:
-18923  18924 -18925 -792 -18926 0
-18923  18924 -18925 -792 -18927 0
-18923  18924 -18925 -792 -18928 0

c  0+1 --> 1
c    (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧  p_792) -> (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0)
c  in CNF:
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_2
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_1
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨  b^{88, 10}_0
c  in DIMACS:
 18923  18924  18925 -792 -18926 0
 18923  18924  18925 -792 -18927 0
 18923  18924  18925 -792  18928 0

c  1+1 --> 2
c    (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0 ∧  p_792) -> (-b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0)
c  in CNF:
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_2
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨  b^{88, 10}_1
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ -p_792 ∨ -b^{88, 10}_0
c  in DIMACS:
 18923  18924 -18925 -792 -18926 0
 18923  18924 -18925 -792  18927 0
 18923  18924 -18925 -792 -18928 0

c  2+1 --> break 
c    (-b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧  p_792) -> break
c  in CNF:
c     b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 18923 -18924  18925 -792 1162 0


c  2-1 --> 1
c    (-b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧ -p_792) -> (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0)
c  in CNF:
c     b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_2
c     b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_1
c     b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨  b^{88, 10}_0
c  in DIMACS:
 18923 -18924  18925  792 -18926 0
 18923 -18924  18925  792 -18927 0
 18923 -18924  18925  792  18928 0

c  1-1 --> 0
c    (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0 ∧ -p_792) -> (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧ -b^{88, 10}_0)
c  in CNF:
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_2
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_1
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_0
c  in DIMACS:
 18923  18924 -18925  792 -18926 0
 18923  18924 -18925  792 -18927 0
 18923  18924 -18925  792 -18928 0

c  0-1 --> -1
c    (-b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧ -p_792) -> ( b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0)
c  in CNF:
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨  b^{88, 10}_2
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_1
c     b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨  b^{88, 10}_0
c  in DIMACS:
 18923  18924  18925  792  18926 0
 18923  18924  18925  792 -18927 0
 18923  18924  18925  792  18928 0

c  -1-1 --> -2
c    ( b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧  b^{88, 9}_0 ∧ -p_792) -> ( b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0)
c  in CNF:
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨  b^{88, 10}_2
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨  b^{88, 10}_1
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨  p_792 ∨ -b^{88, 10}_0
c  in DIMACS:
-18923  18924 -18925  792  18926 0
-18923  18924 -18925  792  18927 0
-18923  18924 -18925  792 -18928 0

c  -2-1 --> break 
c    ( b^{88, 9}_2 ∧  b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨  b^{88, 9}_0 ∨  p_792 ∨ break
c  in DIMACS:
-18923 -18924  18925  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 9}_2 ∧ -b^{88, 9}_1 ∧ -b^{88, 9}_0 ∧ true) 
c  in CNF:
c    -b^{88, 9}_2 ∨  b^{88, 9}_1 ∨  b^{88, 9}_0 ∨ false 
c  in DIMACS:
-18923  18924  18925  0

c  3 does not represent an automaton state.
c    -(-b^{88, 9}_2 ∧  b^{88, 9}_1 ∧  b^{88, 9}_0 ∧ true) 
c  in CNF:
c     b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ false 
c  in DIMACS:
 18923 -18924 -18925  0
c  -3 does not represent an automaton state.
c    -( b^{88, 9}_2 ∧  b^{88, 9}_1 ∧  b^{88, 9}_0 ∧ true) 
c  in CNF:
c    -b^{88, 9}_2 ∨ -b^{88, 9}_1 ∨ -b^{88, 9}_0 ∨ false 
c  in DIMACS:
-18923 -18924 -18925  0

c i = 10
c  -2+1 --> -1
c    ( b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧  p_880) -> ( b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0)
c  in CNF:
c    -b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨  b^{88, 11}_2
c    -b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_1
c    -b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨  b^{88, 11}_0
c  in DIMACS:
-18926 -18927  18928 -880  18929 0
-18926 -18927  18928 -880 -18930 0
-18926 -18927  18928 -880  18931 0

c  -1+1 --> 0
c    ( b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0 ∧  p_880) -> (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧ -b^{88, 11}_0)
c  in CNF:
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_2
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_1
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_0
c  in DIMACS:
-18926  18927 -18928 -880 -18929 0
-18926  18927 -18928 -880 -18930 0
-18926  18927 -18928 -880 -18931 0

c  0+1 --> 1
c    (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧  p_880) -> (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0)
c  in CNF:
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_2
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_1
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨  b^{88, 11}_0
c  in DIMACS:
 18926  18927  18928 -880 -18929 0
 18926  18927  18928 -880 -18930 0
 18926  18927  18928 -880  18931 0

c  1+1 --> 2
c    (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0 ∧  p_880) -> (-b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0)
c  in CNF:
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_2
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨  b^{88, 11}_1
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ -p_880 ∨ -b^{88, 11}_0
c  in DIMACS:
 18926  18927 -18928 -880 -18929 0
 18926  18927 -18928 -880  18930 0
 18926  18927 -18928 -880 -18931 0

c  2+1 --> break 
c    (-b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧  p_880) -> break
c  in CNF:
c     b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 18926 -18927  18928 -880 1162 0


c  2-1 --> 1
c    (-b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧ -p_880) -> (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0)
c  in CNF:
c     b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_2
c     b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_1
c     b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨  b^{88, 11}_0
c  in DIMACS:
 18926 -18927  18928  880 -18929 0
 18926 -18927  18928  880 -18930 0
 18926 -18927  18928  880  18931 0

c  1-1 --> 0
c    (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0 ∧ -p_880) -> (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧ -b^{88, 11}_0)
c  in CNF:
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_2
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_1
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_0
c  in DIMACS:
 18926  18927 -18928  880 -18929 0
 18926  18927 -18928  880 -18930 0
 18926  18927 -18928  880 -18931 0

c  0-1 --> -1
c    (-b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧ -p_880) -> ( b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0)
c  in CNF:
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨  b^{88, 11}_2
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_1
c     b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨  b^{88, 11}_0
c  in DIMACS:
 18926  18927  18928  880  18929 0
 18926  18927  18928  880 -18930 0
 18926  18927  18928  880  18931 0

c  -1-1 --> -2
c    ( b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧  b^{88, 10}_0 ∧ -p_880) -> ( b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0)
c  in CNF:
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨  b^{88, 11}_2
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨  b^{88, 11}_1
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨  p_880 ∨ -b^{88, 11}_0
c  in DIMACS:
-18926  18927 -18928  880  18929 0
-18926  18927 -18928  880  18930 0
-18926  18927 -18928  880 -18931 0

c  -2-1 --> break 
c    ( b^{88, 10}_2 ∧  b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨  b^{88, 10}_0 ∨  p_880 ∨ break
c  in DIMACS:
-18926 -18927  18928  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 10}_2 ∧ -b^{88, 10}_1 ∧ -b^{88, 10}_0 ∧ true) 
c  in CNF:
c    -b^{88, 10}_2 ∨  b^{88, 10}_1 ∨  b^{88, 10}_0 ∨ false 
c  in DIMACS:
-18926  18927  18928  0

c  3 does not represent an automaton state.
c    -(-b^{88, 10}_2 ∧  b^{88, 10}_1 ∧  b^{88, 10}_0 ∧ true) 
c  in CNF:
c     b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ false 
c  in DIMACS:
 18926 -18927 -18928  0
c  -3 does not represent an automaton state.
c    -( b^{88, 10}_2 ∧  b^{88, 10}_1 ∧  b^{88, 10}_0 ∧ true) 
c  in CNF:
c    -b^{88, 10}_2 ∨ -b^{88, 10}_1 ∨ -b^{88, 10}_0 ∨ false 
c  in DIMACS:
-18926 -18927 -18928  0

c i = 11
c  -2+1 --> -1
c    ( b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧  p_968) -> ( b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0)
c  in CNF:
c    -b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨  b^{88, 12}_2
c    -b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_1
c    -b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨  b^{88, 12}_0
c  in DIMACS:
-18929 -18930  18931 -968  18932 0
-18929 -18930  18931 -968 -18933 0
-18929 -18930  18931 -968  18934 0

c  -1+1 --> 0
c    ( b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0 ∧  p_968) -> (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧ -b^{88, 12}_0)
c  in CNF:
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_2
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_1
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_0
c  in DIMACS:
-18929  18930 -18931 -968 -18932 0
-18929  18930 -18931 -968 -18933 0
-18929  18930 -18931 -968 -18934 0

c  0+1 --> 1
c    (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧  p_968) -> (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0)
c  in CNF:
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_2
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_1
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨  b^{88, 12}_0
c  in DIMACS:
 18929  18930  18931 -968 -18932 0
 18929  18930  18931 -968 -18933 0
 18929  18930  18931 -968  18934 0

c  1+1 --> 2
c    (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0 ∧  p_968) -> (-b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0)
c  in CNF:
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_2
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨  b^{88, 12}_1
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ -p_968 ∨ -b^{88, 12}_0
c  in DIMACS:
 18929  18930 -18931 -968 -18932 0
 18929  18930 -18931 -968  18933 0
 18929  18930 -18931 -968 -18934 0

c  2+1 --> break 
c    (-b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧  p_968) -> break
c  in CNF:
c     b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 18929 -18930  18931 -968 1162 0


c  2-1 --> 1
c    (-b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧ -p_968) -> (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0)
c  in CNF:
c     b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_2
c     b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_1
c     b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨  b^{88, 12}_0
c  in DIMACS:
 18929 -18930  18931  968 -18932 0
 18929 -18930  18931  968 -18933 0
 18929 -18930  18931  968  18934 0

c  1-1 --> 0
c    (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0 ∧ -p_968) -> (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧ -b^{88, 12}_0)
c  in CNF:
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_2
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_1
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_0
c  in DIMACS:
 18929  18930 -18931  968 -18932 0
 18929  18930 -18931  968 -18933 0
 18929  18930 -18931  968 -18934 0

c  0-1 --> -1
c    (-b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧ -p_968) -> ( b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0)
c  in CNF:
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨  b^{88, 12}_2
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_1
c     b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨  b^{88, 12}_0
c  in DIMACS:
 18929  18930  18931  968  18932 0
 18929  18930  18931  968 -18933 0
 18929  18930  18931  968  18934 0

c  -1-1 --> -2
c    ( b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧  b^{88, 11}_0 ∧ -p_968) -> ( b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0)
c  in CNF:
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨  b^{88, 12}_2
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨  b^{88, 12}_1
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨  p_968 ∨ -b^{88, 12}_0
c  in DIMACS:
-18929  18930 -18931  968  18932 0
-18929  18930 -18931  968  18933 0
-18929  18930 -18931  968 -18934 0

c  -2-1 --> break 
c    ( b^{88, 11}_2 ∧  b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨  b^{88, 11}_0 ∨  p_968 ∨ break
c  in DIMACS:
-18929 -18930  18931  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 11}_2 ∧ -b^{88, 11}_1 ∧ -b^{88, 11}_0 ∧ true) 
c  in CNF:
c    -b^{88, 11}_2 ∨  b^{88, 11}_1 ∨  b^{88, 11}_0 ∨ false 
c  in DIMACS:
-18929  18930  18931  0

c  3 does not represent an automaton state.
c    -(-b^{88, 11}_2 ∧  b^{88, 11}_1 ∧  b^{88, 11}_0 ∧ true) 
c  in CNF:
c     b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ false 
c  in DIMACS:
 18929 -18930 -18931  0
c  -3 does not represent an automaton state.
c    -( b^{88, 11}_2 ∧  b^{88, 11}_1 ∧  b^{88, 11}_0 ∧ true) 
c  in CNF:
c    -b^{88, 11}_2 ∨ -b^{88, 11}_1 ∨ -b^{88, 11}_0 ∨ false 
c  in DIMACS:
-18929 -18930 -18931  0

c i = 12
c  -2+1 --> -1
c    ( b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧  p_1056) -> ( b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0)
c  in CNF:
c    -b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨  b^{88, 13}_2
c    -b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_1
c    -b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨  b^{88, 13}_0
c  in DIMACS:
-18932 -18933  18934 -1056  18935 0
-18932 -18933  18934 -1056 -18936 0
-18932 -18933  18934 -1056  18937 0

c  -1+1 --> 0
c    ( b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0 ∧  p_1056) -> (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧ -b^{88, 13}_0)
c  in CNF:
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_2
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_1
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_0
c  in DIMACS:
-18932  18933 -18934 -1056 -18935 0
-18932  18933 -18934 -1056 -18936 0
-18932  18933 -18934 -1056 -18937 0

c  0+1 --> 1
c    (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧  p_1056) -> (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0)
c  in CNF:
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_2
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_1
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨  b^{88, 13}_0
c  in DIMACS:
 18932  18933  18934 -1056 -18935 0
 18932  18933  18934 -1056 -18936 0
 18932  18933  18934 -1056  18937 0

c  1+1 --> 2
c    (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0 ∧  p_1056) -> (-b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0)
c  in CNF:
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_2
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨  b^{88, 13}_1
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ -p_1056 ∨ -b^{88, 13}_0
c  in DIMACS:
 18932  18933 -18934 -1056 -18935 0
 18932  18933 -18934 -1056  18936 0
 18932  18933 -18934 -1056 -18937 0

c  2+1 --> break 
c    (-b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 18932 -18933  18934 -1056 1162 0


c  2-1 --> 1
c    (-b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧ -p_1056) -> (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0)
c  in CNF:
c     b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_2
c     b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_1
c     b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨  b^{88, 13}_0
c  in DIMACS:
 18932 -18933  18934  1056 -18935 0
 18932 -18933  18934  1056 -18936 0
 18932 -18933  18934  1056  18937 0

c  1-1 --> 0
c    (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0 ∧ -p_1056) -> (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧ -b^{88, 13}_0)
c  in CNF:
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_2
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_1
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_0
c  in DIMACS:
 18932  18933 -18934  1056 -18935 0
 18932  18933 -18934  1056 -18936 0
 18932  18933 -18934  1056 -18937 0

c  0-1 --> -1
c    (-b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧ -p_1056) -> ( b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0)
c  in CNF:
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨  b^{88, 13}_2
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_1
c     b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨  b^{88, 13}_0
c  in DIMACS:
 18932  18933  18934  1056  18935 0
 18932  18933  18934  1056 -18936 0
 18932  18933  18934  1056  18937 0

c  -1-1 --> -2
c    ( b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧  b^{88, 12}_0 ∧ -p_1056) -> ( b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0)
c  in CNF:
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨  b^{88, 13}_2
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨  b^{88, 13}_1
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨  p_1056 ∨ -b^{88, 13}_0
c  in DIMACS:
-18932  18933 -18934  1056  18935 0
-18932  18933 -18934  1056  18936 0
-18932  18933 -18934  1056 -18937 0

c  -2-1 --> break 
c    ( b^{88, 12}_2 ∧  b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨  b^{88, 12}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-18932 -18933  18934  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 12}_2 ∧ -b^{88, 12}_1 ∧ -b^{88, 12}_0 ∧ true) 
c  in CNF:
c    -b^{88, 12}_2 ∨  b^{88, 12}_1 ∨  b^{88, 12}_0 ∨ false 
c  in DIMACS:
-18932  18933  18934  0

c  3 does not represent an automaton state.
c    -(-b^{88, 12}_2 ∧  b^{88, 12}_1 ∧  b^{88, 12}_0 ∧ true) 
c  in CNF:
c     b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ false 
c  in DIMACS:
 18932 -18933 -18934  0
c  -3 does not represent an automaton state.
c    -( b^{88, 12}_2 ∧  b^{88, 12}_1 ∧  b^{88, 12}_0 ∧ true) 
c  in CNF:
c    -b^{88, 12}_2 ∨ -b^{88, 12}_1 ∨ -b^{88, 12}_0 ∨ false 
c  in DIMACS:
-18932 -18933 -18934  0

c i = 13
c  -2+1 --> -1
c    ( b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧  p_1144) -> ( b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧  b^{88, 14}_0)
c  in CNF:
c    -b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨  b^{88, 14}_2
c    -b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_1
c    -b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨  b^{88, 14}_0
c  in DIMACS:
-18935 -18936  18937 -1144  18938 0
-18935 -18936  18937 -1144 -18939 0
-18935 -18936  18937 -1144  18940 0

c  -1+1 --> 0
c    ( b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0 ∧  p_1144) -> (-b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧ -b^{88, 14}_0)
c  in CNF:
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_2
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_1
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_0
c  in DIMACS:
-18935  18936 -18937 -1144 -18938 0
-18935  18936 -18937 -1144 -18939 0
-18935  18936 -18937 -1144 -18940 0

c  0+1 --> 1
c    (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧  p_1144) -> (-b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧  b^{88, 14}_0)
c  in CNF:
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_2
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_1
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨  b^{88, 14}_0
c  in DIMACS:
 18935  18936  18937 -1144 -18938 0
 18935  18936  18937 -1144 -18939 0
 18935  18936  18937 -1144  18940 0

c  1+1 --> 2
c    (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0 ∧  p_1144) -> (-b^{88, 14}_2 ∧  b^{88, 14}_1 ∧ -b^{88, 14}_0)
c  in CNF:
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_2
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨  b^{88, 14}_1
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ -p_1144 ∨ -b^{88, 14}_0
c  in DIMACS:
 18935  18936 -18937 -1144 -18938 0
 18935  18936 -18937 -1144  18939 0
 18935  18936 -18937 -1144 -18940 0

c  2+1 --> break 
c    (-b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 18935 -18936  18937 -1144 1162 0


c  2-1 --> 1
c    (-b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧ -p_1144) -> (-b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧  b^{88, 14}_0)
c  in CNF:
c     b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_2
c     b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_1
c     b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨  b^{88, 14}_0
c  in DIMACS:
 18935 -18936  18937  1144 -18938 0
 18935 -18936  18937  1144 -18939 0
 18935 -18936  18937  1144  18940 0

c  1-1 --> 0
c    (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0 ∧ -p_1144) -> (-b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧ -b^{88, 14}_0)
c  in CNF:
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_2
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_1
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_0
c  in DIMACS:
 18935  18936 -18937  1144 -18938 0
 18935  18936 -18937  1144 -18939 0
 18935  18936 -18937  1144 -18940 0

c  0-1 --> -1
c    (-b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧ -p_1144) -> ( b^{88, 14}_2 ∧ -b^{88, 14}_1 ∧  b^{88, 14}_0)
c  in CNF:
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨  b^{88, 14}_2
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_1
c     b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨  b^{88, 14}_0
c  in DIMACS:
 18935  18936  18937  1144  18938 0
 18935  18936  18937  1144 -18939 0
 18935  18936  18937  1144  18940 0

c  -1-1 --> -2
c    ( b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧  b^{88, 13}_0 ∧ -p_1144) -> ( b^{88, 14}_2 ∧  b^{88, 14}_1 ∧ -b^{88, 14}_0)
c  in CNF:
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨  b^{88, 14}_2
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨  b^{88, 14}_1
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨  p_1144 ∨ -b^{88, 14}_0
c  in DIMACS:
-18935  18936 -18937  1144  18938 0
-18935  18936 -18937  1144  18939 0
-18935  18936 -18937  1144 -18940 0

c  -2-1 --> break 
c    ( b^{88, 13}_2 ∧  b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨  b^{88, 13}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-18935 -18936  18937  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{88, 13}_2 ∧ -b^{88, 13}_1 ∧ -b^{88, 13}_0 ∧ true) 
c  in CNF:
c    -b^{88, 13}_2 ∨  b^{88, 13}_1 ∨  b^{88, 13}_0 ∨ false 
c  in DIMACS:
-18935  18936  18937  0

c  3 does not represent an automaton state.
c    -(-b^{88, 13}_2 ∧  b^{88, 13}_1 ∧  b^{88, 13}_0 ∧ true) 
c  in CNF:
c     b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ false 
c  in DIMACS:
 18935 -18936 -18937  0
c  -3 does not represent an automaton state.
c    -( b^{88, 13}_2 ∧  b^{88, 13}_1 ∧  b^{88, 13}_0 ∧ true) 
c  in CNF:
c    -b^{88, 13}_2 ∨ -b^{88, 13}_1 ∨ -b^{88, 13}_0 ∨ false 
c  in DIMACS:
-18935 -18936 -18937  0

c INIT for k = 89
c    -b^{89, 1}_2
c    -b^{89, 1}_1
c    -b^{89, 1}_0
c  in DIMACS:
-18941 0
-18942 0
-18943 0

c Transitions for k = 89
c i = 1
c  -2+1 --> -1
c    ( b^{89, 1}_2 ∧  b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧  p_89) -> ( b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0)
c  in CNF:
c    -b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨  b^{89, 2}_2
c    -b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_1
c    -b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨  b^{89, 2}_0
c  in DIMACS:
-18941 -18942  18943 -89  18944 0
-18941 -18942  18943 -89 -18945 0
-18941 -18942  18943 -89  18946 0

c  -1+1 --> 0
c    ( b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧  b^{89, 1}_0 ∧  p_89) -> (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧ -b^{89, 2}_0)
c  in CNF:
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_2
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_1
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_0
c  in DIMACS:
-18941  18942 -18943 -89 -18944 0
-18941  18942 -18943 -89 -18945 0
-18941  18942 -18943 -89 -18946 0

c  0+1 --> 1
c    (-b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧  p_89) -> (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0)
c  in CNF:
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_2
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_1
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨  b^{89, 2}_0
c  in DIMACS:
 18941  18942  18943 -89 -18944 0
 18941  18942  18943 -89 -18945 0
 18941  18942  18943 -89  18946 0

c  1+1 --> 2
c    (-b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧  b^{89, 1}_0 ∧  p_89) -> (-b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0)
c  in CNF:
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_2
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨  b^{89, 2}_1
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ -p_89 ∨ -b^{89, 2}_0
c  in DIMACS:
 18941  18942 -18943 -89 -18944 0
 18941  18942 -18943 -89  18945 0
 18941  18942 -18943 -89 -18946 0

c  2+1 --> break 
c    (-b^{89, 1}_2 ∧  b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧  p_89) -> break
c  in CNF:
c     b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ -p_89 ∨ break
c  in DIMACS:
 18941 -18942  18943 -89 1162 0


c  2-1 --> 1
c    (-b^{89, 1}_2 ∧  b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧ -p_89) -> (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0)
c  in CNF:
c     b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_2
c     b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_1
c     b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨  b^{89, 2}_0
c  in DIMACS:
 18941 -18942  18943  89 -18944 0
 18941 -18942  18943  89 -18945 0
 18941 -18942  18943  89  18946 0

c  1-1 --> 0
c    (-b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧  b^{89, 1}_0 ∧ -p_89) -> (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧ -b^{89, 2}_0)
c  in CNF:
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_2
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_1
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_0
c  in DIMACS:
 18941  18942 -18943  89 -18944 0
 18941  18942 -18943  89 -18945 0
 18941  18942 -18943  89 -18946 0

c  0-1 --> -1
c    (-b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧ -p_89) -> ( b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0)
c  in CNF:
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨  b^{89, 2}_2
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_1
c     b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨  b^{89, 2}_0
c  in DIMACS:
 18941  18942  18943  89  18944 0
 18941  18942  18943  89 -18945 0
 18941  18942  18943  89  18946 0

c  -1-1 --> -2
c    ( b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧  b^{89, 1}_0 ∧ -p_89) -> ( b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0)
c  in CNF:
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨  b^{89, 2}_2
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨  b^{89, 2}_1
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨  p_89 ∨ -b^{89, 2}_0
c  in DIMACS:
-18941  18942 -18943  89  18944 0
-18941  18942 -18943  89  18945 0
-18941  18942 -18943  89 -18946 0

c  -2-1 --> break 
c    ( b^{89, 1}_2 ∧  b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧ -p_89) -> break
c  in CNF:
c    -b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨  b^{89, 1}_0 ∨  p_89 ∨ break
c  in DIMACS:
-18941 -18942  18943  89 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 1}_2 ∧ -b^{89, 1}_1 ∧ -b^{89, 1}_0 ∧ true) 
c  in CNF:
c    -b^{89, 1}_2 ∨  b^{89, 1}_1 ∨  b^{89, 1}_0 ∨ false 
c  in DIMACS:
-18941  18942  18943  0

c  3 does not represent an automaton state.
c    -(-b^{89, 1}_2 ∧  b^{89, 1}_1 ∧  b^{89, 1}_0 ∧ true) 
c  in CNF:
c     b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ false 
c  in DIMACS:
 18941 -18942 -18943  0
c  -3 does not represent an automaton state.
c    -( b^{89, 1}_2 ∧  b^{89, 1}_1 ∧  b^{89, 1}_0 ∧ true) 
c  in CNF:
c    -b^{89, 1}_2 ∨ -b^{89, 1}_1 ∨ -b^{89, 1}_0 ∨ false 
c  in DIMACS:
-18941 -18942 -18943  0

c i = 2
c  -2+1 --> -1
c    ( b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧  p_178) -> ( b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0)
c  in CNF:
c    -b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨  b^{89, 3}_2
c    -b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_1
c    -b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨  b^{89, 3}_0
c  in DIMACS:
-18944 -18945  18946 -178  18947 0
-18944 -18945  18946 -178 -18948 0
-18944 -18945  18946 -178  18949 0

c  -1+1 --> 0
c    ( b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0 ∧  p_178) -> (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧ -b^{89, 3}_0)
c  in CNF:
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_2
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_1
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_0
c  in DIMACS:
-18944  18945 -18946 -178 -18947 0
-18944  18945 -18946 -178 -18948 0
-18944  18945 -18946 -178 -18949 0

c  0+1 --> 1
c    (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧  p_178) -> (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0)
c  in CNF:
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_2
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_1
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨  b^{89, 3}_0
c  in DIMACS:
 18944  18945  18946 -178 -18947 0
 18944  18945  18946 -178 -18948 0
 18944  18945  18946 -178  18949 0

c  1+1 --> 2
c    (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0 ∧  p_178) -> (-b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0)
c  in CNF:
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_2
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨  b^{89, 3}_1
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ -p_178 ∨ -b^{89, 3}_0
c  in DIMACS:
 18944  18945 -18946 -178 -18947 0
 18944  18945 -18946 -178  18948 0
 18944  18945 -18946 -178 -18949 0

c  2+1 --> break 
c    (-b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧  p_178) -> break
c  in CNF:
c     b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ -p_178 ∨ break
c  in DIMACS:
 18944 -18945  18946 -178 1162 0


c  2-1 --> 1
c    (-b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧ -p_178) -> (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0)
c  in CNF:
c     b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_2
c     b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_1
c     b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨  b^{89, 3}_0
c  in DIMACS:
 18944 -18945  18946  178 -18947 0
 18944 -18945  18946  178 -18948 0
 18944 -18945  18946  178  18949 0

c  1-1 --> 0
c    (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0 ∧ -p_178) -> (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧ -b^{89, 3}_0)
c  in CNF:
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_2
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_1
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_0
c  in DIMACS:
 18944  18945 -18946  178 -18947 0
 18944  18945 -18946  178 -18948 0
 18944  18945 -18946  178 -18949 0

c  0-1 --> -1
c    (-b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧ -p_178) -> ( b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0)
c  in CNF:
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨  b^{89, 3}_2
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_1
c     b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨  b^{89, 3}_0
c  in DIMACS:
 18944  18945  18946  178  18947 0
 18944  18945  18946  178 -18948 0
 18944  18945  18946  178  18949 0

c  -1-1 --> -2
c    ( b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧  b^{89, 2}_0 ∧ -p_178) -> ( b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0)
c  in CNF:
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨  b^{89, 3}_2
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨  b^{89, 3}_1
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨  p_178 ∨ -b^{89, 3}_0
c  in DIMACS:
-18944  18945 -18946  178  18947 0
-18944  18945 -18946  178  18948 0
-18944  18945 -18946  178 -18949 0

c  -2-1 --> break 
c    ( b^{89, 2}_2 ∧  b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧ -p_178) -> break
c  in CNF:
c    -b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨  b^{89, 2}_0 ∨  p_178 ∨ break
c  in DIMACS:
-18944 -18945  18946  178 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 2}_2 ∧ -b^{89, 2}_1 ∧ -b^{89, 2}_0 ∧ true) 
c  in CNF:
c    -b^{89, 2}_2 ∨  b^{89, 2}_1 ∨  b^{89, 2}_0 ∨ false 
c  in DIMACS:
-18944  18945  18946  0

c  3 does not represent an automaton state.
c    -(-b^{89, 2}_2 ∧  b^{89, 2}_1 ∧  b^{89, 2}_0 ∧ true) 
c  in CNF:
c     b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ false 
c  in DIMACS:
 18944 -18945 -18946  0
c  -3 does not represent an automaton state.
c    -( b^{89, 2}_2 ∧  b^{89, 2}_1 ∧  b^{89, 2}_0 ∧ true) 
c  in CNF:
c    -b^{89, 2}_2 ∨ -b^{89, 2}_1 ∨ -b^{89, 2}_0 ∨ false 
c  in DIMACS:
-18944 -18945 -18946  0

c i = 3
c  -2+1 --> -1
c    ( b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧  p_267) -> ( b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0)
c  in CNF:
c    -b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨  b^{89, 4}_2
c    -b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_1
c    -b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨  b^{89, 4}_0
c  in DIMACS:
-18947 -18948  18949 -267  18950 0
-18947 -18948  18949 -267 -18951 0
-18947 -18948  18949 -267  18952 0

c  -1+1 --> 0
c    ( b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0 ∧  p_267) -> (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧ -b^{89, 4}_0)
c  in CNF:
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_2
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_1
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_0
c  in DIMACS:
-18947  18948 -18949 -267 -18950 0
-18947  18948 -18949 -267 -18951 0
-18947  18948 -18949 -267 -18952 0

c  0+1 --> 1
c    (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧  p_267) -> (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0)
c  in CNF:
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_2
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_1
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨  b^{89, 4}_0
c  in DIMACS:
 18947  18948  18949 -267 -18950 0
 18947  18948  18949 -267 -18951 0
 18947  18948  18949 -267  18952 0

c  1+1 --> 2
c    (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0 ∧  p_267) -> (-b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0)
c  in CNF:
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_2
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨  b^{89, 4}_1
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ -p_267 ∨ -b^{89, 4}_0
c  in DIMACS:
 18947  18948 -18949 -267 -18950 0
 18947  18948 -18949 -267  18951 0
 18947  18948 -18949 -267 -18952 0

c  2+1 --> break 
c    (-b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧  p_267) -> break
c  in CNF:
c     b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ -p_267 ∨ break
c  in DIMACS:
 18947 -18948  18949 -267 1162 0


c  2-1 --> 1
c    (-b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧ -p_267) -> (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0)
c  in CNF:
c     b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_2
c     b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_1
c     b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨  b^{89, 4}_0
c  in DIMACS:
 18947 -18948  18949  267 -18950 0
 18947 -18948  18949  267 -18951 0
 18947 -18948  18949  267  18952 0

c  1-1 --> 0
c    (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0 ∧ -p_267) -> (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧ -b^{89, 4}_0)
c  in CNF:
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_2
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_1
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_0
c  in DIMACS:
 18947  18948 -18949  267 -18950 0
 18947  18948 -18949  267 -18951 0
 18947  18948 -18949  267 -18952 0

c  0-1 --> -1
c    (-b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧ -p_267) -> ( b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0)
c  in CNF:
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨  b^{89, 4}_2
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_1
c     b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨  b^{89, 4}_0
c  in DIMACS:
 18947  18948  18949  267  18950 0
 18947  18948  18949  267 -18951 0
 18947  18948  18949  267  18952 0

c  -1-1 --> -2
c    ( b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧  b^{89, 3}_0 ∧ -p_267) -> ( b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0)
c  in CNF:
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨  b^{89, 4}_2
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨  b^{89, 4}_1
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨  p_267 ∨ -b^{89, 4}_0
c  in DIMACS:
-18947  18948 -18949  267  18950 0
-18947  18948 -18949  267  18951 0
-18947  18948 -18949  267 -18952 0

c  -2-1 --> break 
c    ( b^{89, 3}_2 ∧  b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧ -p_267) -> break
c  in CNF:
c    -b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨  b^{89, 3}_0 ∨  p_267 ∨ break
c  in DIMACS:
-18947 -18948  18949  267 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 3}_2 ∧ -b^{89, 3}_1 ∧ -b^{89, 3}_0 ∧ true) 
c  in CNF:
c    -b^{89, 3}_2 ∨  b^{89, 3}_1 ∨  b^{89, 3}_0 ∨ false 
c  in DIMACS:
-18947  18948  18949  0

c  3 does not represent an automaton state.
c    -(-b^{89, 3}_2 ∧  b^{89, 3}_1 ∧  b^{89, 3}_0 ∧ true) 
c  in CNF:
c     b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ false 
c  in DIMACS:
 18947 -18948 -18949  0
c  -3 does not represent an automaton state.
c    -( b^{89, 3}_2 ∧  b^{89, 3}_1 ∧  b^{89, 3}_0 ∧ true) 
c  in CNF:
c    -b^{89, 3}_2 ∨ -b^{89, 3}_1 ∨ -b^{89, 3}_0 ∨ false 
c  in DIMACS:
-18947 -18948 -18949  0

c i = 4
c  -2+1 --> -1
c    ( b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧  p_356) -> ( b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0)
c  in CNF:
c    -b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨  b^{89, 5}_2
c    -b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_1
c    -b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨  b^{89, 5}_0
c  in DIMACS:
-18950 -18951  18952 -356  18953 0
-18950 -18951  18952 -356 -18954 0
-18950 -18951  18952 -356  18955 0

c  -1+1 --> 0
c    ( b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0 ∧  p_356) -> (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧ -b^{89, 5}_0)
c  in CNF:
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_2
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_1
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_0
c  in DIMACS:
-18950  18951 -18952 -356 -18953 0
-18950  18951 -18952 -356 -18954 0
-18950  18951 -18952 -356 -18955 0

c  0+1 --> 1
c    (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧  p_356) -> (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0)
c  in CNF:
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_2
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_1
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨  b^{89, 5}_0
c  in DIMACS:
 18950  18951  18952 -356 -18953 0
 18950  18951  18952 -356 -18954 0
 18950  18951  18952 -356  18955 0

c  1+1 --> 2
c    (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0 ∧  p_356) -> (-b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0)
c  in CNF:
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_2
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨  b^{89, 5}_1
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ -p_356 ∨ -b^{89, 5}_0
c  in DIMACS:
 18950  18951 -18952 -356 -18953 0
 18950  18951 -18952 -356  18954 0
 18950  18951 -18952 -356 -18955 0

c  2+1 --> break 
c    (-b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧  p_356) -> break
c  in CNF:
c     b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 18950 -18951  18952 -356 1162 0


c  2-1 --> 1
c    (-b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧ -p_356) -> (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0)
c  in CNF:
c     b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_2
c     b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_1
c     b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨  b^{89, 5}_0
c  in DIMACS:
 18950 -18951  18952  356 -18953 0
 18950 -18951  18952  356 -18954 0
 18950 -18951  18952  356  18955 0

c  1-1 --> 0
c    (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0 ∧ -p_356) -> (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧ -b^{89, 5}_0)
c  in CNF:
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_2
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_1
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_0
c  in DIMACS:
 18950  18951 -18952  356 -18953 0
 18950  18951 -18952  356 -18954 0
 18950  18951 -18952  356 -18955 0

c  0-1 --> -1
c    (-b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧ -p_356) -> ( b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0)
c  in CNF:
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨  b^{89, 5}_2
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_1
c     b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨  b^{89, 5}_0
c  in DIMACS:
 18950  18951  18952  356  18953 0
 18950  18951  18952  356 -18954 0
 18950  18951  18952  356  18955 0

c  -1-1 --> -2
c    ( b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧  b^{89, 4}_0 ∧ -p_356) -> ( b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0)
c  in CNF:
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨  b^{89, 5}_2
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨  b^{89, 5}_1
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨  p_356 ∨ -b^{89, 5}_0
c  in DIMACS:
-18950  18951 -18952  356  18953 0
-18950  18951 -18952  356  18954 0
-18950  18951 -18952  356 -18955 0

c  -2-1 --> break 
c    ( b^{89, 4}_2 ∧  b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨  b^{89, 4}_0 ∨  p_356 ∨ break
c  in DIMACS:
-18950 -18951  18952  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 4}_2 ∧ -b^{89, 4}_1 ∧ -b^{89, 4}_0 ∧ true) 
c  in CNF:
c    -b^{89, 4}_2 ∨  b^{89, 4}_1 ∨  b^{89, 4}_0 ∨ false 
c  in DIMACS:
-18950  18951  18952  0

c  3 does not represent an automaton state.
c    -(-b^{89, 4}_2 ∧  b^{89, 4}_1 ∧  b^{89, 4}_0 ∧ true) 
c  in CNF:
c     b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ false 
c  in DIMACS:
 18950 -18951 -18952  0
c  -3 does not represent an automaton state.
c    -( b^{89, 4}_2 ∧  b^{89, 4}_1 ∧  b^{89, 4}_0 ∧ true) 
c  in CNF:
c    -b^{89, 4}_2 ∨ -b^{89, 4}_1 ∨ -b^{89, 4}_0 ∨ false 
c  in DIMACS:
-18950 -18951 -18952  0

c i = 5
c  -2+1 --> -1
c    ( b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧  p_445) -> ( b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0)
c  in CNF:
c    -b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨  b^{89, 6}_2
c    -b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_1
c    -b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨  b^{89, 6}_0
c  in DIMACS:
-18953 -18954  18955 -445  18956 0
-18953 -18954  18955 -445 -18957 0
-18953 -18954  18955 -445  18958 0

c  -1+1 --> 0
c    ( b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0 ∧  p_445) -> (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧ -b^{89, 6}_0)
c  in CNF:
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_2
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_1
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_0
c  in DIMACS:
-18953  18954 -18955 -445 -18956 0
-18953  18954 -18955 -445 -18957 0
-18953  18954 -18955 -445 -18958 0

c  0+1 --> 1
c    (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧  p_445) -> (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0)
c  in CNF:
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_2
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_1
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨  b^{89, 6}_0
c  in DIMACS:
 18953  18954  18955 -445 -18956 0
 18953  18954  18955 -445 -18957 0
 18953  18954  18955 -445  18958 0

c  1+1 --> 2
c    (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0 ∧  p_445) -> (-b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0)
c  in CNF:
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_2
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨  b^{89, 6}_1
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ -p_445 ∨ -b^{89, 6}_0
c  in DIMACS:
 18953  18954 -18955 -445 -18956 0
 18953  18954 -18955 -445  18957 0
 18953  18954 -18955 -445 -18958 0

c  2+1 --> break 
c    (-b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧  p_445) -> break
c  in CNF:
c     b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ -p_445 ∨ break
c  in DIMACS:
 18953 -18954  18955 -445 1162 0


c  2-1 --> 1
c    (-b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧ -p_445) -> (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0)
c  in CNF:
c     b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_2
c     b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_1
c     b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨  b^{89, 6}_0
c  in DIMACS:
 18953 -18954  18955  445 -18956 0
 18953 -18954  18955  445 -18957 0
 18953 -18954  18955  445  18958 0

c  1-1 --> 0
c    (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0 ∧ -p_445) -> (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧ -b^{89, 6}_0)
c  in CNF:
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_2
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_1
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_0
c  in DIMACS:
 18953  18954 -18955  445 -18956 0
 18953  18954 -18955  445 -18957 0
 18953  18954 -18955  445 -18958 0

c  0-1 --> -1
c    (-b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧ -p_445) -> ( b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0)
c  in CNF:
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨  b^{89, 6}_2
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_1
c     b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨  b^{89, 6}_0
c  in DIMACS:
 18953  18954  18955  445  18956 0
 18953  18954  18955  445 -18957 0
 18953  18954  18955  445  18958 0

c  -1-1 --> -2
c    ( b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧  b^{89, 5}_0 ∧ -p_445) -> ( b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0)
c  in CNF:
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨  b^{89, 6}_2
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨  b^{89, 6}_1
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨  p_445 ∨ -b^{89, 6}_0
c  in DIMACS:
-18953  18954 -18955  445  18956 0
-18953  18954 -18955  445  18957 0
-18953  18954 -18955  445 -18958 0

c  -2-1 --> break 
c    ( b^{89, 5}_2 ∧  b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧ -p_445) -> break
c  in CNF:
c    -b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨  b^{89, 5}_0 ∨  p_445 ∨ break
c  in DIMACS:
-18953 -18954  18955  445 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 5}_2 ∧ -b^{89, 5}_1 ∧ -b^{89, 5}_0 ∧ true) 
c  in CNF:
c    -b^{89, 5}_2 ∨  b^{89, 5}_1 ∨  b^{89, 5}_0 ∨ false 
c  in DIMACS:
-18953  18954  18955  0

c  3 does not represent an automaton state.
c    -(-b^{89, 5}_2 ∧  b^{89, 5}_1 ∧  b^{89, 5}_0 ∧ true) 
c  in CNF:
c     b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ false 
c  in DIMACS:
 18953 -18954 -18955  0
c  -3 does not represent an automaton state.
c    -( b^{89, 5}_2 ∧  b^{89, 5}_1 ∧  b^{89, 5}_0 ∧ true) 
c  in CNF:
c    -b^{89, 5}_2 ∨ -b^{89, 5}_1 ∨ -b^{89, 5}_0 ∨ false 
c  in DIMACS:
-18953 -18954 -18955  0

c i = 6
c  -2+1 --> -1
c    ( b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧  p_534) -> ( b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0)
c  in CNF:
c    -b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨  b^{89, 7}_2
c    -b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_1
c    -b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨  b^{89, 7}_0
c  in DIMACS:
-18956 -18957  18958 -534  18959 0
-18956 -18957  18958 -534 -18960 0
-18956 -18957  18958 -534  18961 0

c  -1+1 --> 0
c    ( b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0 ∧  p_534) -> (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧ -b^{89, 7}_0)
c  in CNF:
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_2
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_1
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_0
c  in DIMACS:
-18956  18957 -18958 -534 -18959 0
-18956  18957 -18958 -534 -18960 0
-18956  18957 -18958 -534 -18961 0

c  0+1 --> 1
c    (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧  p_534) -> (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0)
c  in CNF:
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_2
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_1
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨  b^{89, 7}_0
c  in DIMACS:
 18956  18957  18958 -534 -18959 0
 18956  18957  18958 -534 -18960 0
 18956  18957  18958 -534  18961 0

c  1+1 --> 2
c    (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0 ∧  p_534) -> (-b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0)
c  in CNF:
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_2
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨  b^{89, 7}_1
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ -p_534 ∨ -b^{89, 7}_0
c  in DIMACS:
 18956  18957 -18958 -534 -18959 0
 18956  18957 -18958 -534  18960 0
 18956  18957 -18958 -534 -18961 0

c  2+1 --> break 
c    (-b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧  p_534) -> break
c  in CNF:
c     b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 18956 -18957  18958 -534 1162 0


c  2-1 --> 1
c    (-b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧ -p_534) -> (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0)
c  in CNF:
c     b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_2
c     b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_1
c     b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨  b^{89, 7}_0
c  in DIMACS:
 18956 -18957  18958  534 -18959 0
 18956 -18957  18958  534 -18960 0
 18956 -18957  18958  534  18961 0

c  1-1 --> 0
c    (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0 ∧ -p_534) -> (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧ -b^{89, 7}_0)
c  in CNF:
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_2
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_1
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_0
c  in DIMACS:
 18956  18957 -18958  534 -18959 0
 18956  18957 -18958  534 -18960 0
 18956  18957 -18958  534 -18961 0

c  0-1 --> -1
c    (-b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧ -p_534) -> ( b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0)
c  in CNF:
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨  b^{89, 7}_2
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_1
c     b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨  b^{89, 7}_0
c  in DIMACS:
 18956  18957  18958  534  18959 0
 18956  18957  18958  534 -18960 0
 18956  18957  18958  534  18961 0

c  -1-1 --> -2
c    ( b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧  b^{89, 6}_0 ∧ -p_534) -> ( b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0)
c  in CNF:
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨  b^{89, 7}_2
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨  b^{89, 7}_1
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨  p_534 ∨ -b^{89, 7}_0
c  in DIMACS:
-18956  18957 -18958  534  18959 0
-18956  18957 -18958  534  18960 0
-18956  18957 -18958  534 -18961 0

c  -2-1 --> break 
c    ( b^{89, 6}_2 ∧  b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨  b^{89, 6}_0 ∨  p_534 ∨ break
c  in DIMACS:
-18956 -18957  18958  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 6}_2 ∧ -b^{89, 6}_1 ∧ -b^{89, 6}_0 ∧ true) 
c  in CNF:
c    -b^{89, 6}_2 ∨  b^{89, 6}_1 ∨  b^{89, 6}_0 ∨ false 
c  in DIMACS:
-18956  18957  18958  0

c  3 does not represent an automaton state.
c    -(-b^{89, 6}_2 ∧  b^{89, 6}_1 ∧  b^{89, 6}_0 ∧ true) 
c  in CNF:
c     b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ false 
c  in DIMACS:
 18956 -18957 -18958  0
c  -3 does not represent an automaton state.
c    -( b^{89, 6}_2 ∧  b^{89, 6}_1 ∧  b^{89, 6}_0 ∧ true) 
c  in CNF:
c    -b^{89, 6}_2 ∨ -b^{89, 6}_1 ∨ -b^{89, 6}_0 ∨ false 
c  in DIMACS:
-18956 -18957 -18958  0

c i = 7
c  -2+1 --> -1
c    ( b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧  p_623) -> ( b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0)
c  in CNF:
c    -b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨  b^{89, 8}_2
c    -b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_1
c    -b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨  b^{89, 8}_0
c  in DIMACS:
-18959 -18960  18961 -623  18962 0
-18959 -18960  18961 -623 -18963 0
-18959 -18960  18961 -623  18964 0

c  -1+1 --> 0
c    ( b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0 ∧  p_623) -> (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧ -b^{89, 8}_0)
c  in CNF:
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_2
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_1
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_0
c  in DIMACS:
-18959  18960 -18961 -623 -18962 0
-18959  18960 -18961 -623 -18963 0
-18959  18960 -18961 -623 -18964 0

c  0+1 --> 1
c    (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧  p_623) -> (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0)
c  in CNF:
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_2
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_1
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨  b^{89, 8}_0
c  in DIMACS:
 18959  18960  18961 -623 -18962 0
 18959  18960  18961 -623 -18963 0
 18959  18960  18961 -623  18964 0

c  1+1 --> 2
c    (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0 ∧  p_623) -> (-b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0)
c  in CNF:
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_2
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨  b^{89, 8}_1
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ -p_623 ∨ -b^{89, 8}_0
c  in DIMACS:
 18959  18960 -18961 -623 -18962 0
 18959  18960 -18961 -623  18963 0
 18959  18960 -18961 -623 -18964 0

c  2+1 --> break 
c    (-b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧  p_623) -> break
c  in CNF:
c     b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ -p_623 ∨ break
c  in DIMACS:
 18959 -18960  18961 -623 1162 0


c  2-1 --> 1
c    (-b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧ -p_623) -> (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0)
c  in CNF:
c     b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_2
c     b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_1
c     b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨  b^{89, 8}_0
c  in DIMACS:
 18959 -18960  18961  623 -18962 0
 18959 -18960  18961  623 -18963 0
 18959 -18960  18961  623  18964 0

c  1-1 --> 0
c    (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0 ∧ -p_623) -> (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧ -b^{89, 8}_0)
c  in CNF:
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_2
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_1
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_0
c  in DIMACS:
 18959  18960 -18961  623 -18962 0
 18959  18960 -18961  623 -18963 0
 18959  18960 -18961  623 -18964 0

c  0-1 --> -1
c    (-b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧ -p_623) -> ( b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0)
c  in CNF:
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨  b^{89, 8}_2
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_1
c     b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨  b^{89, 8}_0
c  in DIMACS:
 18959  18960  18961  623  18962 0
 18959  18960  18961  623 -18963 0
 18959  18960  18961  623  18964 0

c  -1-1 --> -2
c    ( b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧  b^{89, 7}_0 ∧ -p_623) -> ( b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0)
c  in CNF:
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨  b^{89, 8}_2
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨  b^{89, 8}_1
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨  p_623 ∨ -b^{89, 8}_0
c  in DIMACS:
-18959  18960 -18961  623  18962 0
-18959  18960 -18961  623  18963 0
-18959  18960 -18961  623 -18964 0

c  -2-1 --> break 
c    ( b^{89, 7}_2 ∧  b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧ -p_623) -> break
c  in CNF:
c    -b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨  b^{89, 7}_0 ∨  p_623 ∨ break
c  in DIMACS:
-18959 -18960  18961  623 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 7}_2 ∧ -b^{89, 7}_1 ∧ -b^{89, 7}_0 ∧ true) 
c  in CNF:
c    -b^{89, 7}_2 ∨  b^{89, 7}_1 ∨  b^{89, 7}_0 ∨ false 
c  in DIMACS:
-18959  18960  18961  0

c  3 does not represent an automaton state.
c    -(-b^{89, 7}_2 ∧  b^{89, 7}_1 ∧  b^{89, 7}_0 ∧ true) 
c  in CNF:
c     b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ false 
c  in DIMACS:
 18959 -18960 -18961  0
c  -3 does not represent an automaton state.
c    -( b^{89, 7}_2 ∧  b^{89, 7}_1 ∧  b^{89, 7}_0 ∧ true) 
c  in CNF:
c    -b^{89, 7}_2 ∨ -b^{89, 7}_1 ∨ -b^{89, 7}_0 ∨ false 
c  in DIMACS:
-18959 -18960 -18961  0

c i = 8
c  -2+1 --> -1
c    ( b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧  p_712) -> ( b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0)
c  in CNF:
c    -b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨  b^{89, 9}_2
c    -b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_1
c    -b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨  b^{89, 9}_0
c  in DIMACS:
-18962 -18963  18964 -712  18965 0
-18962 -18963  18964 -712 -18966 0
-18962 -18963  18964 -712  18967 0

c  -1+1 --> 0
c    ( b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0 ∧  p_712) -> (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧ -b^{89, 9}_0)
c  in CNF:
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_2
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_1
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_0
c  in DIMACS:
-18962  18963 -18964 -712 -18965 0
-18962  18963 -18964 -712 -18966 0
-18962  18963 -18964 -712 -18967 0

c  0+1 --> 1
c    (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧  p_712) -> (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0)
c  in CNF:
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_2
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_1
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨  b^{89, 9}_0
c  in DIMACS:
 18962  18963  18964 -712 -18965 0
 18962  18963  18964 -712 -18966 0
 18962  18963  18964 -712  18967 0

c  1+1 --> 2
c    (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0 ∧  p_712) -> (-b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0)
c  in CNF:
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_2
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨  b^{89, 9}_1
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ -p_712 ∨ -b^{89, 9}_0
c  in DIMACS:
 18962  18963 -18964 -712 -18965 0
 18962  18963 -18964 -712  18966 0
 18962  18963 -18964 -712 -18967 0

c  2+1 --> break 
c    (-b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧  p_712) -> break
c  in CNF:
c     b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 18962 -18963  18964 -712 1162 0


c  2-1 --> 1
c    (-b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧ -p_712) -> (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0)
c  in CNF:
c     b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_2
c     b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_1
c     b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨  b^{89, 9}_0
c  in DIMACS:
 18962 -18963  18964  712 -18965 0
 18962 -18963  18964  712 -18966 0
 18962 -18963  18964  712  18967 0

c  1-1 --> 0
c    (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0 ∧ -p_712) -> (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧ -b^{89, 9}_0)
c  in CNF:
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_2
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_1
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_0
c  in DIMACS:
 18962  18963 -18964  712 -18965 0
 18962  18963 -18964  712 -18966 0
 18962  18963 -18964  712 -18967 0

c  0-1 --> -1
c    (-b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧ -p_712) -> ( b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0)
c  in CNF:
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨  b^{89, 9}_2
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_1
c     b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨  b^{89, 9}_0
c  in DIMACS:
 18962  18963  18964  712  18965 0
 18962  18963  18964  712 -18966 0
 18962  18963  18964  712  18967 0

c  -1-1 --> -2
c    ( b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧  b^{89, 8}_0 ∧ -p_712) -> ( b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0)
c  in CNF:
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨  b^{89, 9}_2
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨  b^{89, 9}_1
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨  p_712 ∨ -b^{89, 9}_0
c  in DIMACS:
-18962  18963 -18964  712  18965 0
-18962  18963 -18964  712  18966 0
-18962  18963 -18964  712 -18967 0

c  -2-1 --> break 
c    ( b^{89, 8}_2 ∧  b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨  b^{89, 8}_0 ∨  p_712 ∨ break
c  in DIMACS:
-18962 -18963  18964  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 8}_2 ∧ -b^{89, 8}_1 ∧ -b^{89, 8}_0 ∧ true) 
c  in CNF:
c    -b^{89, 8}_2 ∨  b^{89, 8}_1 ∨  b^{89, 8}_0 ∨ false 
c  in DIMACS:
-18962  18963  18964  0

c  3 does not represent an automaton state.
c    -(-b^{89, 8}_2 ∧  b^{89, 8}_1 ∧  b^{89, 8}_0 ∧ true) 
c  in CNF:
c     b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ false 
c  in DIMACS:
 18962 -18963 -18964  0
c  -3 does not represent an automaton state.
c    -( b^{89, 8}_2 ∧  b^{89, 8}_1 ∧  b^{89, 8}_0 ∧ true) 
c  in CNF:
c    -b^{89, 8}_2 ∨ -b^{89, 8}_1 ∨ -b^{89, 8}_0 ∨ false 
c  in DIMACS:
-18962 -18963 -18964  0

c i = 9
c  -2+1 --> -1
c    ( b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧  p_801) -> ( b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0)
c  in CNF:
c    -b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨  b^{89, 10}_2
c    -b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_1
c    -b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨  b^{89, 10}_0
c  in DIMACS:
-18965 -18966  18967 -801  18968 0
-18965 -18966  18967 -801 -18969 0
-18965 -18966  18967 -801  18970 0

c  -1+1 --> 0
c    ( b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0 ∧  p_801) -> (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧ -b^{89, 10}_0)
c  in CNF:
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_2
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_1
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_0
c  in DIMACS:
-18965  18966 -18967 -801 -18968 0
-18965  18966 -18967 -801 -18969 0
-18965  18966 -18967 -801 -18970 0

c  0+1 --> 1
c    (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧  p_801) -> (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0)
c  in CNF:
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_2
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_1
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨  b^{89, 10}_0
c  in DIMACS:
 18965  18966  18967 -801 -18968 0
 18965  18966  18967 -801 -18969 0
 18965  18966  18967 -801  18970 0

c  1+1 --> 2
c    (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0 ∧  p_801) -> (-b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0)
c  in CNF:
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_2
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨  b^{89, 10}_1
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ -p_801 ∨ -b^{89, 10}_0
c  in DIMACS:
 18965  18966 -18967 -801 -18968 0
 18965  18966 -18967 -801  18969 0
 18965  18966 -18967 -801 -18970 0

c  2+1 --> break 
c    (-b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧  p_801) -> break
c  in CNF:
c     b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ -p_801 ∨ break
c  in DIMACS:
 18965 -18966  18967 -801 1162 0


c  2-1 --> 1
c    (-b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧ -p_801) -> (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0)
c  in CNF:
c     b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_2
c     b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_1
c     b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨  b^{89, 10}_0
c  in DIMACS:
 18965 -18966  18967  801 -18968 0
 18965 -18966  18967  801 -18969 0
 18965 -18966  18967  801  18970 0

c  1-1 --> 0
c    (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0 ∧ -p_801) -> (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧ -b^{89, 10}_0)
c  in CNF:
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_2
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_1
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_0
c  in DIMACS:
 18965  18966 -18967  801 -18968 0
 18965  18966 -18967  801 -18969 0
 18965  18966 -18967  801 -18970 0

c  0-1 --> -1
c    (-b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧ -p_801) -> ( b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0)
c  in CNF:
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨  b^{89, 10}_2
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_1
c     b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨  b^{89, 10}_0
c  in DIMACS:
 18965  18966  18967  801  18968 0
 18965  18966  18967  801 -18969 0
 18965  18966  18967  801  18970 0

c  -1-1 --> -2
c    ( b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧  b^{89, 9}_0 ∧ -p_801) -> ( b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0)
c  in CNF:
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨  b^{89, 10}_2
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨  b^{89, 10}_1
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨  p_801 ∨ -b^{89, 10}_0
c  in DIMACS:
-18965  18966 -18967  801  18968 0
-18965  18966 -18967  801  18969 0
-18965  18966 -18967  801 -18970 0

c  -2-1 --> break 
c    ( b^{89, 9}_2 ∧  b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧ -p_801) -> break
c  in CNF:
c    -b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨  b^{89, 9}_0 ∨  p_801 ∨ break
c  in DIMACS:
-18965 -18966  18967  801 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 9}_2 ∧ -b^{89, 9}_1 ∧ -b^{89, 9}_0 ∧ true) 
c  in CNF:
c    -b^{89, 9}_2 ∨  b^{89, 9}_1 ∨  b^{89, 9}_0 ∨ false 
c  in DIMACS:
-18965  18966  18967  0

c  3 does not represent an automaton state.
c    -(-b^{89, 9}_2 ∧  b^{89, 9}_1 ∧  b^{89, 9}_0 ∧ true) 
c  in CNF:
c     b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ false 
c  in DIMACS:
 18965 -18966 -18967  0
c  -3 does not represent an automaton state.
c    -( b^{89, 9}_2 ∧  b^{89, 9}_1 ∧  b^{89, 9}_0 ∧ true) 
c  in CNF:
c    -b^{89, 9}_2 ∨ -b^{89, 9}_1 ∨ -b^{89, 9}_0 ∨ false 
c  in DIMACS:
-18965 -18966 -18967  0

c i = 10
c  -2+1 --> -1
c    ( b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧  p_890) -> ( b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0)
c  in CNF:
c    -b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨  b^{89, 11}_2
c    -b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_1
c    -b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨  b^{89, 11}_0
c  in DIMACS:
-18968 -18969  18970 -890  18971 0
-18968 -18969  18970 -890 -18972 0
-18968 -18969  18970 -890  18973 0

c  -1+1 --> 0
c    ( b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0 ∧  p_890) -> (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧ -b^{89, 11}_0)
c  in CNF:
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_2
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_1
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_0
c  in DIMACS:
-18968  18969 -18970 -890 -18971 0
-18968  18969 -18970 -890 -18972 0
-18968  18969 -18970 -890 -18973 0

c  0+1 --> 1
c    (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧  p_890) -> (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0)
c  in CNF:
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_2
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_1
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨  b^{89, 11}_0
c  in DIMACS:
 18968  18969  18970 -890 -18971 0
 18968  18969  18970 -890 -18972 0
 18968  18969  18970 -890  18973 0

c  1+1 --> 2
c    (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0 ∧  p_890) -> (-b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0)
c  in CNF:
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_2
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨  b^{89, 11}_1
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ -p_890 ∨ -b^{89, 11}_0
c  in DIMACS:
 18968  18969 -18970 -890 -18971 0
 18968  18969 -18970 -890  18972 0
 18968  18969 -18970 -890 -18973 0

c  2+1 --> break 
c    (-b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧  p_890) -> break
c  in CNF:
c     b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 18968 -18969  18970 -890 1162 0


c  2-1 --> 1
c    (-b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧ -p_890) -> (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0)
c  in CNF:
c     b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_2
c     b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_1
c     b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨  b^{89, 11}_0
c  in DIMACS:
 18968 -18969  18970  890 -18971 0
 18968 -18969  18970  890 -18972 0
 18968 -18969  18970  890  18973 0

c  1-1 --> 0
c    (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0 ∧ -p_890) -> (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧ -b^{89, 11}_0)
c  in CNF:
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_2
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_1
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_0
c  in DIMACS:
 18968  18969 -18970  890 -18971 0
 18968  18969 -18970  890 -18972 0
 18968  18969 -18970  890 -18973 0

c  0-1 --> -1
c    (-b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧ -p_890) -> ( b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0)
c  in CNF:
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨  b^{89, 11}_2
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_1
c     b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨  b^{89, 11}_0
c  in DIMACS:
 18968  18969  18970  890  18971 0
 18968  18969  18970  890 -18972 0
 18968  18969  18970  890  18973 0

c  -1-1 --> -2
c    ( b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧  b^{89, 10}_0 ∧ -p_890) -> ( b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0)
c  in CNF:
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨  b^{89, 11}_2
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨  b^{89, 11}_1
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨  p_890 ∨ -b^{89, 11}_0
c  in DIMACS:
-18968  18969 -18970  890  18971 0
-18968  18969 -18970  890  18972 0
-18968  18969 -18970  890 -18973 0

c  -2-1 --> break 
c    ( b^{89, 10}_2 ∧  b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨  b^{89, 10}_0 ∨  p_890 ∨ break
c  in DIMACS:
-18968 -18969  18970  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 10}_2 ∧ -b^{89, 10}_1 ∧ -b^{89, 10}_0 ∧ true) 
c  in CNF:
c    -b^{89, 10}_2 ∨  b^{89, 10}_1 ∨  b^{89, 10}_0 ∨ false 
c  in DIMACS:
-18968  18969  18970  0

c  3 does not represent an automaton state.
c    -(-b^{89, 10}_2 ∧  b^{89, 10}_1 ∧  b^{89, 10}_0 ∧ true) 
c  in CNF:
c     b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ false 
c  in DIMACS:
 18968 -18969 -18970  0
c  -3 does not represent an automaton state.
c    -( b^{89, 10}_2 ∧  b^{89, 10}_1 ∧  b^{89, 10}_0 ∧ true) 
c  in CNF:
c    -b^{89, 10}_2 ∨ -b^{89, 10}_1 ∨ -b^{89, 10}_0 ∨ false 
c  in DIMACS:
-18968 -18969 -18970  0

c i = 11
c  -2+1 --> -1
c    ( b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧  p_979) -> ( b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0)
c  in CNF:
c    -b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨  b^{89, 12}_2
c    -b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_1
c    -b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨  b^{89, 12}_0
c  in DIMACS:
-18971 -18972  18973 -979  18974 0
-18971 -18972  18973 -979 -18975 0
-18971 -18972  18973 -979  18976 0

c  -1+1 --> 0
c    ( b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0 ∧  p_979) -> (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧ -b^{89, 12}_0)
c  in CNF:
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_2
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_1
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_0
c  in DIMACS:
-18971  18972 -18973 -979 -18974 0
-18971  18972 -18973 -979 -18975 0
-18971  18972 -18973 -979 -18976 0

c  0+1 --> 1
c    (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧  p_979) -> (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0)
c  in CNF:
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_2
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_1
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨  b^{89, 12}_0
c  in DIMACS:
 18971  18972  18973 -979 -18974 0
 18971  18972  18973 -979 -18975 0
 18971  18972  18973 -979  18976 0

c  1+1 --> 2
c    (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0 ∧  p_979) -> (-b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0)
c  in CNF:
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_2
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨  b^{89, 12}_1
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ -p_979 ∨ -b^{89, 12}_0
c  in DIMACS:
 18971  18972 -18973 -979 -18974 0
 18971  18972 -18973 -979  18975 0
 18971  18972 -18973 -979 -18976 0

c  2+1 --> break 
c    (-b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧  p_979) -> break
c  in CNF:
c     b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ -p_979 ∨ break
c  in DIMACS:
 18971 -18972  18973 -979 1162 0


c  2-1 --> 1
c    (-b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧ -p_979) -> (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0)
c  in CNF:
c     b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_2
c     b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_1
c     b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨  b^{89, 12}_0
c  in DIMACS:
 18971 -18972  18973  979 -18974 0
 18971 -18972  18973  979 -18975 0
 18971 -18972  18973  979  18976 0

c  1-1 --> 0
c    (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0 ∧ -p_979) -> (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧ -b^{89, 12}_0)
c  in CNF:
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_2
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_1
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_0
c  in DIMACS:
 18971  18972 -18973  979 -18974 0
 18971  18972 -18973  979 -18975 0
 18971  18972 -18973  979 -18976 0

c  0-1 --> -1
c    (-b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧ -p_979) -> ( b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0)
c  in CNF:
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨  b^{89, 12}_2
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_1
c     b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨  b^{89, 12}_0
c  in DIMACS:
 18971  18972  18973  979  18974 0
 18971  18972  18973  979 -18975 0
 18971  18972  18973  979  18976 0

c  -1-1 --> -2
c    ( b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧  b^{89, 11}_0 ∧ -p_979) -> ( b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0)
c  in CNF:
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨  b^{89, 12}_2
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨  b^{89, 12}_1
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨  p_979 ∨ -b^{89, 12}_0
c  in DIMACS:
-18971  18972 -18973  979  18974 0
-18971  18972 -18973  979  18975 0
-18971  18972 -18973  979 -18976 0

c  -2-1 --> break 
c    ( b^{89, 11}_2 ∧  b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧ -p_979) -> break
c  in CNF:
c    -b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨  b^{89, 11}_0 ∨  p_979 ∨ break
c  in DIMACS:
-18971 -18972  18973  979 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 11}_2 ∧ -b^{89, 11}_1 ∧ -b^{89, 11}_0 ∧ true) 
c  in CNF:
c    -b^{89, 11}_2 ∨  b^{89, 11}_1 ∨  b^{89, 11}_0 ∨ false 
c  in DIMACS:
-18971  18972  18973  0

c  3 does not represent an automaton state.
c    -(-b^{89, 11}_2 ∧  b^{89, 11}_1 ∧  b^{89, 11}_0 ∧ true) 
c  in CNF:
c     b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ false 
c  in DIMACS:
 18971 -18972 -18973  0
c  -3 does not represent an automaton state.
c    -( b^{89, 11}_2 ∧  b^{89, 11}_1 ∧  b^{89, 11}_0 ∧ true) 
c  in CNF:
c    -b^{89, 11}_2 ∨ -b^{89, 11}_1 ∨ -b^{89, 11}_0 ∨ false 
c  in DIMACS:
-18971 -18972 -18973  0

c i = 12
c  -2+1 --> -1
c    ( b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧  p_1068) -> ( b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0)
c  in CNF:
c    -b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨  b^{89, 13}_2
c    -b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_1
c    -b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨  b^{89, 13}_0
c  in DIMACS:
-18974 -18975  18976 -1068  18977 0
-18974 -18975  18976 -1068 -18978 0
-18974 -18975  18976 -1068  18979 0

c  -1+1 --> 0
c    ( b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0 ∧  p_1068) -> (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧ -b^{89, 13}_0)
c  in CNF:
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_2
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_1
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_0
c  in DIMACS:
-18974  18975 -18976 -1068 -18977 0
-18974  18975 -18976 -1068 -18978 0
-18974  18975 -18976 -1068 -18979 0

c  0+1 --> 1
c    (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧  p_1068) -> (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0)
c  in CNF:
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_2
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_1
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨  b^{89, 13}_0
c  in DIMACS:
 18974  18975  18976 -1068 -18977 0
 18974  18975  18976 -1068 -18978 0
 18974  18975  18976 -1068  18979 0

c  1+1 --> 2
c    (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0 ∧  p_1068) -> (-b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0)
c  in CNF:
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_2
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨  b^{89, 13}_1
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ -p_1068 ∨ -b^{89, 13}_0
c  in DIMACS:
 18974  18975 -18976 -1068 -18977 0
 18974  18975 -18976 -1068  18978 0
 18974  18975 -18976 -1068 -18979 0

c  2+1 --> break 
c    (-b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 18974 -18975  18976 -1068 1162 0


c  2-1 --> 1
c    (-b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧ -p_1068) -> (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0)
c  in CNF:
c     b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_2
c     b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_1
c     b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨  b^{89, 13}_0
c  in DIMACS:
 18974 -18975  18976  1068 -18977 0
 18974 -18975  18976  1068 -18978 0
 18974 -18975  18976  1068  18979 0

c  1-1 --> 0
c    (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0 ∧ -p_1068) -> (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧ -b^{89, 13}_0)
c  in CNF:
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_2
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_1
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_0
c  in DIMACS:
 18974  18975 -18976  1068 -18977 0
 18974  18975 -18976  1068 -18978 0
 18974  18975 -18976  1068 -18979 0

c  0-1 --> -1
c    (-b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧ -p_1068) -> ( b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0)
c  in CNF:
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨  b^{89, 13}_2
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_1
c     b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨  b^{89, 13}_0
c  in DIMACS:
 18974  18975  18976  1068  18977 0
 18974  18975  18976  1068 -18978 0
 18974  18975  18976  1068  18979 0

c  -1-1 --> -2
c    ( b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧  b^{89, 12}_0 ∧ -p_1068) -> ( b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0)
c  in CNF:
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨  b^{89, 13}_2
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨  b^{89, 13}_1
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨  p_1068 ∨ -b^{89, 13}_0
c  in DIMACS:
-18974  18975 -18976  1068  18977 0
-18974  18975 -18976  1068  18978 0
-18974  18975 -18976  1068 -18979 0

c  -2-1 --> break 
c    ( b^{89, 12}_2 ∧  b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨  b^{89, 12}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-18974 -18975  18976  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 12}_2 ∧ -b^{89, 12}_1 ∧ -b^{89, 12}_0 ∧ true) 
c  in CNF:
c    -b^{89, 12}_2 ∨  b^{89, 12}_1 ∨  b^{89, 12}_0 ∨ false 
c  in DIMACS:
-18974  18975  18976  0

c  3 does not represent an automaton state.
c    -(-b^{89, 12}_2 ∧  b^{89, 12}_1 ∧  b^{89, 12}_0 ∧ true) 
c  in CNF:
c     b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ false 
c  in DIMACS:
 18974 -18975 -18976  0
c  -3 does not represent an automaton state.
c    -( b^{89, 12}_2 ∧  b^{89, 12}_1 ∧  b^{89, 12}_0 ∧ true) 
c  in CNF:
c    -b^{89, 12}_2 ∨ -b^{89, 12}_1 ∨ -b^{89, 12}_0 ∨ false 
c  in DIMACS:
-18974 -18975 -18976  0

c i = 13
c  -2+1 --> -1
c    ( b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧  p_1157) -> ( b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧  b^{89, 14}_0)
c  in CNF:
c    -b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨  b^{89, 14}_2
c    -b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_1
c    -b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨  b^{89, 14}_0
c  in DIMACS:
-18977 -18978  18979 -1157  18980 0
-18977 -18978  18979 -1157 -18981 0
-18977 -18978  18979 -1157  18982 0

c  -1+1 --> 0
c    ( b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0 ∧  p_1157) -> (-b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧ -b^{89, 14}_0)
c  in CNF:
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_2
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_1
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_0
c  in DIMACS:
-18977  18978 -18979 -1157 -18980 0
-18977  18978 -18979 -1157 -18981 0
-18977  18978 -18979 -1157 -18982 0

c  0+1 --> 1
c    (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧  p_1157) -> (-b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧  b^{89, 14}_0)
c  in CNF:
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_2
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_1
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨  b^{89, 14}_0
c  in DIMACS:
 18977  18978  18979 -1157 -18980 0
 18977  18978  18979 -1157 -18981 0
 18977  18978  18979 -1157  18982 0

c  1+1 --> 2
c    (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0 ∧  p_1157) -> (-b^{89, 14}_2 ∧  b^{89, 14}_1 ∧ -b^{89, 14}_0)
c  in CNF:
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_2
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨  b^{89, 14}_1
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ -p_1157 ∨ -b^{89, 14}_0
c  in DIMACS:
 18977  18978 -18979 -1157 -18980 0
 18977  18978 -18979 -1157  18981 0
 18977  18978 -18979 -1157 -18982 0

c  2+1 --> break 
c    (-b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧  p_1157) -> break
c  in CNF:
c     b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ -p_1157 ∨ break
c  in DIMACS:
 18977 -18978  18979 -1157 1162 0


c  2-1 --> 1
c    (-b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧ -p_1157) -> (-b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧  b^{89, 14}_0)
c  in CNF:
c     b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_2
c     b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_1
c     b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨  b^{89, 14}_0
c  in DIMACS:
 18977 -18978  18979  1157 -18980 0
 18977 -18978  18979  1157 -18981 0
 18977 -18978  18979  1157  18982 0

c  1-1 --> 0
c    (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0 ∧ -p_1157) -> (-b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧ -b^{89, 14}_0)
c  in CNF:
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_2
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_1
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_0
c  in DIMACS:
 18977  18978 -18979  1157 -18980 0
 18977  18978 -18979  1157 -18981 0
 18977  18978 -18979  1157 -18982 0

c  0-1 --> -1
c    (-b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧ -p_1157) -> ( b^{89, 14}_2 ∧ -b^{89, 14}_1 ∧  b^{89, 14}_0)
c  in CNF:
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨  b^{89, 14}_2
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_1
c     b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨  b^{89, 14}_0
c  in DIMACS:
 18977  18978  18979  1157  18980 0
 18977  18978  18979  1157 -18981 0
 18977  18978  18979  1157  18982 0

c  -1-1 --> -2
c    ( b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧  b^{89, 13}_0 ∧ -p_1157) -> ( b^{89, 14}_2 ∧  b^{89, 14}_1 ∧ -b^{89, 14}_0)
c  in CNF:
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨  b^{89, 14}_2
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨  b^{89, 14}_1
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨  p_1157 ∨ -b^{89, 14}_0
c  in DIMACS:
-18977  18978 -18979  1157  18980 0
-18977  18978 -18979  1157  18981 0
-18977  18978 -18979  1157 -18982 0

c  -2-1 --> break 
c    ( b^{89, 13}_2 ∧  b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧ -p_1157) -> break
c  in CNF:
c    -b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨  b^{89, 13}_0 ∨  p_1157 ∨ break
c  in DIMACS:
-18977 -18978  18979  1157 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{89, 13}_2 ∧ -b^{89, 13}_1 ∧ -b^{89, 13}_0 ∧ true) 
c  in CNF:
c    -b^{89, 13}_2 ∨  b^{89, 13}_1 ∨  b^{89, 13}_0 ∨ false 
c  in DIMACS:
-18977  18978  18979  0

c  3 does not represent an automaton state.
c    -(-b^{89, 13}_2 ∧  b^{89, 13}_1 ∧  b^{89, 13}_0 ∧ true) 
c  in CNF:
c     b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ false 
c  in DIMACS:
 18977 -18978 -18979  0
c  -3 does not represent an automaton state.
c    -( b^{89, 13}_2 ∧  b^{89, 13}_1 ∧  b^{89, 13}_0 ∧ true) 
c  in CNF:
c    -b^{89, 13}_2 ∨ -b^{89, 13}_1 ∨ -b^{89, 13}_0 ∨ false 
c  in DIMACS:
-18977 -18978 -18979  0

c INIT for k = 90
c    -b^{90, 1}_2
c    -b^{90, 1}_1
c    -b^{90, 1}_0
c  in DIMACS:
-18983 0
-18984 0
-18985 0

c Transitions for k = 90
c i = 1
c  -2+1 --> -1
c    ( b^{90, 1}_2 ∧  b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧  p_90) -> ( b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0)
c  in CNF:
c    -b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨  b^{90, 2}_2
c    -b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_1
c    -b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨  b^{90, 2}_0
c  in DIMACS:
-18983 -18984  18985 -90  18986 0
-18983 -18984  18985 -90 -18987 0
-18983 -18984  18985 -90  18988 0

c  -1+1 --> 0
c    ( b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧  b^{90, 1}_0 ∧  p_90) -> (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧ -b^{90, 2}_0)
c  in CNF:
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_2
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_1
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_0
c  in DIMACS:
-18983  18984 -18985 -90 -18986 0
-18983  18984 -18985 -90 -18987 0
-18983  18984 -18985 -90 -18988 0

c  0+1 --> 1
c    (-b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧  p_90) -> (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0)
c  in CNF:
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_2
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_1
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨  b^{90, 2}_0
c  in DIMACS:
 18983  18984  18985 -90 -18986 0
 18983  18984  18985 -90 -18987 0
 18983  18984  18985 -90  18988 0

c  1+1 --> 2
c    (-b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧  b^{90, 1}_0 ∧  p_90) -> (-b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0)
c  in CNF:
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_2
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨  b^{90, 2}_1
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ -p_90 ∨ -b^{90, 2}_0
c  in DIMACS:
 18983  18984 -18985 -90 -18986 0
 18983  18984 -18985 -90  18987 0
 18983  18984 -18985 -90 -18988 0

c  2+1 --> break 
c    (-b^{90, 1}_2 ∧  b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧  p_90) -> break
c  in CNF:
c     b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ -p_90 ∨ break
c  in DIMACS:
 18983 -18984  18985 -90 1162 0


c  2-1 --> 1
c    (-b^{90, 1}_2 ∧  b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧ -p_90) -> (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0)
c  in CNF:
c     b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_2
c     b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_1
c     b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨  b^{90, 2}_0
c  in DIMACS:
 18983 -18984  18985  90 -18986 0
 18983 -18984  18985  90 -18987 0
 18983 -18984  18985  90  18988 0

c  1-1 --> 0
c    (-b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧  b^{90, 1}_0 ∧ -p_90) -> (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧ -b^{90, 2}_0)
c  in CNF:
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_2
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_1
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_0
c  in DIMACS:
 18983  18984 -18985  90 -18986 0
 18983  18984 -18985  90 -18987 0
 18983  18984 -18985  90 -18988 0

c  0-1 --> -1
c    (-b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧ -p_90) -> ( b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0)
c  in CNF:
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨  b^{90, 2}_2
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_1
c     b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨  b^{90, 2}_0
c  in DIMACS:
 18983  18984  18985  90  18986 0
 18983  18984  18985  90 -18987 0
 18983  18984  18985  90  18988 0

c  -1-1 --> -2
c    ( b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧  b^{90, 1}_0 ∧ -p_90) -> ( b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0)
c  in CNF:
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨  b^{90, 2}_2
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨  b^{90, 2}_1
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨  p_90 ∨ -b^{90, 2}_0
c  in DIMACS:
-18983  18984 -18985  90  18986 0
-18983  18984 -18985  90  18987 0
-18983  18984 -18985  90 -18988 0

c  -2-1 --> break 
c    ( b^{90, 1}_2 ∧  b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧ -p_90) -> break
c  in CNF:
c    -b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨  b^{90, 1}_0 ∨  p_90 ∨ break
c  in DIMACS:
-18983 -18984  18985  90 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 1}_2 ∧ -b^{90, 1}_1 ∧ -b^{90, 1}_0 ∧ true) 
c  in CNF:
c    -b^{90, 1}_2 ∨  b^{90, 1}_1 ∨  b^{90, 1}_0 ∨ false 
c  in DIMACS:
-18983  18984  18985  0

c  3 does not represent an automaton state.
c    -(-b^{90, 1}_2 ∧  b^{90, 1}_1 ∧  b^{90, 1}_0 ∧ true) 
c  in CNF:
c     b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ false 
c  in DIMACS:
 18983 -18984 -18985  0
c  -3 does not represent an automaton state.
c    -( b^{90, 1}_2 ∧  b^{90, 1}_1 ∧  b^{90, 1}_0 ∧ true) 
c  in CNF:
c    -b^{90, 1}_2 ∨ -b^{90, 1}_1 ∨ -b^{90, 1}_0 ∨ false 
c  in DIMACS:
-18983 -18984 -18985  0

c i = 2
c  -2+1 --> -1
c    ( b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧  p_180) -> ( b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0)
c  in CNF:
c    -b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨  b^{90, 3}_2
c    -b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_1
c    -b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨  b^{90, 3}_0
c  in DIMACS:
-18986 -18987  18988 -180  18989 0
-18986 -18987  18988 -180 -18990 0
-18986 -18987  18988 -180  18991 0

c  -1+1 --> 0
c    ( b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0 ∧  p_180) -> (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧ -b^{90, 3}_0)
c  in CNF:
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_2
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_1
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_0
c  in DIMACS:
-18986  18987 -18988 -180 -18989 0
-18986  18987 -18988 -180 -18990 0
-18986  18987 -18988 -180 -18991 0

c  0+1 --> 1
c    (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧  p_180) -> (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0)
c  in CNF:
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_2
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_1
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨  b^{90, 3}_0
c  in DIMACS:
 18986  18987  18988 -180 -18989 0
 18986  18987  18988 -180 -18990 0
 18986  18987  18988 -180  18991 0

c  1+1 --> 2
c    (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0 ∧  p_180) -> (-b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0)
c  in CNF:
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_2
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨  b^{90, 3}_1
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ -p_180 ∨ -b^{90, 3}_0
c  in DIMACS:
 18986  18987 -18988 -180 -18989 0
 18986  18987 -18988 -180  18990 0
 18986  18987 -18988 -180 -18991 0

c  2+1 --> break 
c    (-b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧  p_180) -> break
c  in CNF:
c     b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 18986 -18987  18988 -180 1162 0


c  2-1 --> 1
c    (-b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧ -p_180) -> (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0)
c  in CNF:
c     b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_2
c     b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_1
c     b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨  b^{90, 3}_0
c  in DIMACS:
 18986 -18987  18988  180 -18989 0
 18986 -18987  18988  180 -18990 0
 18986 -18987  18988  180  18991 0

c  1-1 --> 0
c    (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0 ∧ -p_180) -> (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧ -b^{90, 3}_0)
c  in CNF:
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_2
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_1
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_0
c  in DIMACS:
 18986  18987 -18988  180 -18989 0
 18986  18987 -18988  180 -18990 0
 18986  18987 -18988  180 -18991 0

c  0-1 --> -1
c    (-b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧ -p_180) -> ( b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0)
c  in CNF:
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨  b^{90, 3}_2
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_1
c     b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨  b^{90, 3}_0
c  in DIMACS:
 18986  18987  18988  180  18989 0
 18986  18987  18988  180 -18990 0
 18986  18987  18988  180  18991 0

c  -1-1 --> -2
c    ( b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧  b^{90, 2}_0 ∧ -p_180) -> ( b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0)
c  in CNF:
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨  b^{90, 3}_2
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨  b^{90, 3}_1
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨  p_180 ∨ -b^{90, 3}_0
c  in DIMACS:
-18986  18987 -18988  180  18989 0
-18986  18987 -18988  180  18990 0
-18986  18987 -18988  180 -18991 0

c  -2-1 --> break 
c    ( b^{90, 2}_2 ∧  b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨  b^{90, 2}_0 ∨  p_180 ∨ break
c  in DIMACS:
-18986 -18987  18988  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 2}_2 ∧ -b^{90, 2}_1 ∧ -b^{90, 2}_0 ∧ true) 
c  in CNF:
c    -b^{90, 2}_2 ∨  b^{90, 2}_1 ∨  b^{90, 2}_0 ∨ false 
c  in DIMACS:
-18986  18987  18988  0

c  3 does not represent an automaton state.
c    -(-b^{90, 2}_2 ∧  b^{90, 2}_1 ∧  b^{90, 2}_0 ∧ true) 
c  in CNF:
c     b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ false 
c  in DIMACS:
 18986 -18987 -18988  0
c  -3 does not represent an automaton state.
c    -( b^{90, 2}_2 ∧  b^{90, 2}_1 ∧  b^{90, 2}_0 ∧ true) 
c  in CNF:
c    -b^{90, 2}_2 ∨ -b^{90, 2}_1 ∨ -b^{90, 2}_0 ∨ false 
c  in DIMACS:
-18986 -18987 -18988  0

c i = 3
c  -2+1 --> -1
c    ( b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧  p_270) -> ( b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0)
c  in CNF:
c    -b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨  b^{90, 4}_2
c    -b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_1
c    -b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨  b^{90, 4}_0
c  in DIMACS:
-18989 -18990  18991 -270  18992 0
-18989 -18990  18991 -270 -18993 0
-18989 -18990  18991 -270  18994 0

c  -1+1 --> 0
c    ( b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0 ∧  p_270) -> (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧ -b^{90, 4}_0)
c  in CNF:
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_2
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_1
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_0
c  in DIMACS:
-18989  18990 -18991 -270 -18992 0
-18989  18990 -18991 -270 -18993 0
-18989  18990 -18991 -270 -18994 0

c  0+1 --> 1
c    (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧  p_270) -> (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0)
c  in CNF:
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_2
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_1
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨  b^{90, 4}_0
c  in DIMACS:
 18989  18990  18991 -270 -18992 0
 18989  18990  18991 -270 -18993 0
 18989  18990  18991 -270  18994 0

c  1+1 --> 2
c    (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0 ∧  p_270) -> (-b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0)
c  in CNF:
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_2
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨  b^{90, 4}_1
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ -p_270 ∨ -b^{90, 4}_0
c  in DIMACS:
 18989  18990 -18991 -270 -18992 0
 18989  18990 -18991 -270  18993 0
 18989  18990 -18991 -270 -18994 0

c  2+1 --> break 
c    (-b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧  p_270) -> break
c  in CNF:
c     b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 18989 -18990  18991 -270 1162 0


c  2-1 --> 1
c    (-b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧ -p_270) -> (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0)
c  in CNF:
c     b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_2
c     b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_1
c     b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨  b^{90, 4}_0
c  in DIMACS:
 18989 -18990  18991  270 -18992 0
 18989 -18990  18991  270 -18993 0
 18989 -18990  18991  270  18994 0

c  1-1 --> 0
c    (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0 ∧ -p_270) -> (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧ -b^{90, 4}_0)
c  in CNF:
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_2
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_1
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_0
c  in DIMACS:
 18989  18990 -18991  270 -18992 0
 18989  18990 -18991  270 -18993 0
 18989  18990 -18991  270 -18994 0

c  0-1 --> -1
c    (-b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧ -p_270) -> ( b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0)
c  in CNF:
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨  b^{90, 4}_2
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_1
c     b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨  b^{90, 4}_0
c  in DIMACS:
 18989  18990  18991  270  18992 0
 18989  18990  18991  270 -18993 0
 18989  18990  18991  270  18994 0

c  -1-1 --> -2
c    ( b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧  b^{90, 3}_0 ∧ -p_270) -> ( b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0)
c  in CNF:
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨  b^{90, 4}_2
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨  b^{90, 4}_1
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨  p_270 ∨ -b^{90, 4}_0
c  in DIMACS:
-18989  18990 -18991  270  18992 0
-18989  18990 -18991  270  18993 0
-18989  18990 -18991  270 -18994 0

c  -2-1 --> break 
c    ( b^{90, 3}_2 ∧  b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨  b^{90, 3}_0 ∨  p_270 ∨ break
c  in DIMACS:
-18989 -18990  18991  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 3}_2 ∧ -b^{90, 3}_1 ∧ -b^{90, 3}_0 ∧ true) 
c  in CNF:
c    -b^{90, 3}_2 ∨  b^{90, 3}_1 ∨  b^{90, 3}_0 ∨ false 
c  in DIMACS:
-18989  18990  18991  0

c  3 does not represent an automaton state.
c    -(-b^{90, 3}_2 ∧  b^{90, 3}_1 ∧  b^{90, 3}_0 ∧ true) 
c  in CNF:
c     b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ false 
c  in DIMACS:
 18989 -18990 -18991  0
c  -3 does not represent an automaton state.
c    -( b^{90, 3}_2 ∧  b^{90, 3}_1 ∧  b^{90, 3}_0 ∧ true) 
c  in CNF:
c    -b^{90, 3}_2 ∨ -b^{90, 3}_1 ∨ -b^{90, 3}_0 ∨ false 
c  in DIMACS:
-18989 -18990 -18991  0

c i = 4
c  -2+1 --> -1
c    ( b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧  p_360) -> ( b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0)
c  in CNF:
c    -b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨  b^{90, 5}_2
c    -b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_1
c    -b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨  b^{90, 5}_0
c  in DIMACS:
-18992 -18993  18994 -360  18995 0
-18992 -18993  18994 -360 -18996 0
-18992 -18993  18994 -360  18997 0

c  -1+1 --> 0
c    ( b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0 ∧  p_360) -> (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧ -b^{90, 5}_0)
c  in CNF:
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_2
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_1
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_0
c  in DIMACS:
-18992  18993 -18994 -360 -18995 0
-18992  18993 -18994 -360 -18996 0
-18992  18993 -18994 -360 -18997 0

c  0+1 --> 1
c    (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧  p_360) -> (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0)
c  in CNF:
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_2
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_1
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨  b^{90, 5}_0
c  in DIMACS:
 18992  18993  18994 -360 -18995 0
 18992  18993  18994 -360 -18996 0
 18992  18993  18994 -360  18997 0

c  1+1 --> 2
c    (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0 ∧  p_360) -> (-b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0)
c  in CNF:
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_2
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨  b^{90, 5}_1
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ -p_360 ∨ -b^{90, 5}_0
c  in DIMACS:
 18992  18993 -18994 -360 -18995 0
 18992  18993 -18994 -360  18996 0
 18992  18993 -18994 -360 -18997 0

c  2+1 --> break 
c    (-b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧  p_360) -> break
c  in CNF:
c     b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 18992 -18993  18994 -360 1162 0


c  2-1 --> 1
c    (-b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧ -p_360) -> (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0)
c  in CNF:
c     b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_2
c     b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_1
c     b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨  b^{90, 5}_0
c  in DIMACS:
 18992 -18993  18994  360 -18995 0
 18992 -18993  18994  360 -18996 0
 18992 -18993  18994  360  18997 0

c  1-1 --> 0
c    (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0 ∧ -p_360) -> (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧ -b^{90, 5}_0)
c  in CNF:
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_2
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_1
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_0
c  in DIMACS:
 18992  18993 -18994  360 -18995 0
 18992  18993 -18994  360 -18996 0
 18992  18993 -18994  360 -18997 0

c  0-1 --> -1
c    (-b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧ -p_360) -> ( b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0)
c  in CNF:
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨  b^{90, 5}_2
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_1
c     b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨  b^{90, 5}_0
c  in DIMACS:
 18992  18993  18994  360  18995 0
 18992  18993  18994  360 -18996 0
 18992  18993  18994  360  18997 0

c  -1-1 --> -2
c    ( b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧  b^{90, 4}_0 ∧ -p_360) -> ( b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0)
c  in CNF:
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨  b^{90, 5}_2
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨  b^{90, 5}_1
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨  p_360 ∨ -b^{90, 5}_0
c  in DIMACS:
-18992  18993 -18994  360  18995 0
-18992  18993 -18994  360  18996 0
-18992  18993 -18994  360 -18997 0

c  -2-1 --> break 
c    ( b^{90, 4}_2 ∧  b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨  b^{90, 4}_0 ∨  p_360 ∨ break
c  in DIMACS:
-18992 -18993  18994  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 4}_2 ∧ -b^{90, 4}_1 ∧ -b^{90, 4}_0 ∧ true) 
c  in CNF:
c    -b^{90, 4}_2 ∨  b^{90, 4}_1 ∨  b^{90, 4}_0 ∨ false 
c  in DIMACS:
-18992  18993  18994  0

c  3 does not represent an automaton state.
c    -(-b^{90, 4}_2 ∧  b^{90, 4}_1 ∧  b^{90, 4}_0 ∧ true) 
c  in CNF:
c     b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ false 
c  in DIMACS:
 18992 -18993 -18994  0
c  -3 does not represent an automaton state.
c    -( b^{90, 4}_2 ∧  b^{90, 4}_1 ∧  b^{90, 4}_0 ∧ true) 
c  in CNF:
c    -b^{90, 4}_2 ∨ -b^{90, 4}_1 ∨ -b^{90, 4}_0 ∨ false 
c  in DIMACS:
-18992 -18993 -18994  0

c i = 5
c  -2+1 --> -1
c    ( b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧  p_450) -> ( b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0)
c  in CNF:
c    -b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨  b^{90, 6}_2
c    -b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_1
c    -b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨  b^{90, 6}_0
c  in DIMACS:
-18995 -18996  18997 -450  18998 0
-18995 -18996  18997 -450 -18999 0
-18995 -18996  18997 -450  19000 0

c  -1+1 --> 0
c    ( b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0 ∧  p_450) -> (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧ -b^{90, 6}_0)
c  in CNF:
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_2
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_1
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_0
c  in DIMACS:
-18995  18996 -18997 -450 -18998 0
-18995  18996 -18997 -450 -18999 0
-18995  18996 -18997 -450 -19000 0

c  0+1 --> 1
c    (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧  p_450) -> (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0)
c  in CNF:
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_2
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_1
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨  b^{90, 6}_0
c  in DIMACS:
 18995  18996  18997 -450 -18998 0
 18995  18996  18997 -450 -18999 0
 18995  18996  18997 -450  19000 0

c  1+1 --> 2
c    (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0 ∧  p_450) -> (-b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0)
c  in CNF:
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_2
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨  b^{90, 6}_1
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ -p_450 ∨ -b^{90, 6}_0
c  in DIMACS:
 18995  18996 -18997 -450 -18998 0
 18995  18996 -18997 -450  18999 0
 18995  18996 -18997 -450 -19000 0

c  2+1 --> break 
c    (-b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧  p_450) -> break
c  in CNF:
c     b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 18995 -18996  18997 -450 1162 0


c  2-1 --> 1
c    (-b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧ -p_450) -> (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0)
c  in CNF:
c     b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_2
c     b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_1
c     b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨  b^{90, 6}_0
c  in DIMACS:
 18995 -18996  18997  450 -18998 0
 18995 -18996  18997  450 -18999 0
 18995 -18996  18997  450  19000 0

c  1-1 --> 0
c    (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0 ∧ -p_450) -> (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧ -b^{90, 6}_0)
c  in CNF:
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_2
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_1
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_0
c  in DIMACS:
 18995  18996 -18997  450 -18998 0
 18995  18996 -18997  450 -18999 0
 18995  18996 -18997  450 -19000 0

c  0-1 --> -1
c    (-b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧ -p_450) -> ( b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0)
c  in CNF:
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨  b^{90, 6}_2
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_1
c     b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨  b^{90, 6}_0
c  in DIMACS:
 18995  18996  18997  450  18998 0
 18995  18996  18997  450 -18999 0
 18995  18996  18997  450  19000 0

c  -1-1 --> -2
c    ( b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧  b^{90, 5}_0 ∧ -p_450) -> ( b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0)
c  in CNF:
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨  b^{90, 6}_2
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨  b^{90, 6}_1
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨  p_450 ∨ -b^{90, 6}_0
c  in DIMACS:
-18995  18996 -18997  450  18998 0
-18995  18996 -18997  450  18999 0
-18995  18996 -18997  450 -19000 0

c  -2-1 --> break 
c    ( b^{90, 5}_2 ∧  b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨  b^{90, 5}_0 ∨  p_450 ∨ break
c  in DIMACS:
-18995 -18996  18997  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 5}_2 ∧ -b^{90, 5}_1 ∧ -b^{90, 5}_0 ∧ true) 
c  in CNF:
c    -b^{90, 5}_2 ∨  b^{90, 5}_1 ∨  b^{90, 5}_0 ∨ false 
c  in DIMACS:
-18995  18996  18997  0

c  3 does not represent an automaton state.
c    -(-b^{90, 5}_2 ∧  b^{90, 5}_1 ∧  b^{90, 5}_0 ∧ true) 
c  in CNF:
c     b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ false 
c  in DIMACS:
 18995 -18996 -18997  0
c  -3 does not represent an automaton state.
c    -( b^{90, 5}_2 ∧  b^{90, 5}_1 ∧  b^{90, 5}_0 ∧ true) 
c  in CNF:
c    -b^{90, 5}_2 ∨ -b^{90, 5}_1 ∨ -b^{90, 5}_0 ∨ false 
c  in DIMACS:
-18995 -18996 -18997  0

c i = 6
c  -2+1 --> -1
c    ( b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧  p_540) -> ( b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0)
c  in CNF:
c    -b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨  b^{90, 7}_2
c    -b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_1
c    -b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨  b^{90, 7}_0
c  in DIMACS:
-18998 -18999  19000 -540  19001 0
-18998 -18999  19000 -540 -19002 0
-18998 -18999  19000 -540  19003 0

c  -1+1 --> 0
c    ( b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0 ∧  p_540) -> (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧ -b^{90, 7}_0)
c  in CNF:
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_2
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_1
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_0
c  in DIMACS:
-18998  18999 -19000 -540 -19001 0
-18998  18999 -19000 -540 -19002 0
-18998  18999 -19000 -540 -19003 0

c  0+1 --> 1
c    (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧  p_540) -> (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0)
c  in CNF:
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_2
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_1
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨  b^{90, 7}_0
c  in DIMACS:
 18998  18999  19000 -540 -19001 0
 18998  18999  19000 -540 -19002 0
 18998  18999  19000 -540  19003 0

c  1+1 --> 2
c    (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0 ∧  p_540) -> (-b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0)
c  in CNF:
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_2
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨  b^{90, 7}_1
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ -p_540 ∨ -b^{90, 7}_0
c  in DIMACS:
 18998  18999 -19000 -540 -19001 0
 18998  18999 -19000 -540  19002 0
 18998  18999 -19000 -540 -19003 0

c  2+1 --> break 
c    (-b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧  p_540) -> break
c  in CNF:
c     b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 18998 -18999  19000 -540 1162 0


c  2-1 --> 1
c    (-b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧ -p_540) -> (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0)
c  in CNF:
c     b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_2
c     b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_1
c     b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨  b^{90, 7}_0
c  in DIMACS:
 18998 -18999  19000  540 -19001 0
 18998 -18999  19000  540 -19002 0
 18998 -18999  19000  540  19003 0

c  1-1 --> 0
c    (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0 ∧ -p_540) -> (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧ -b^{90, 7}_0)
c  in CNF:
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_2
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_1
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_0
c  in DIMACS:
 18998  18999 -19000  540 -19001 0
 18998  18999 -19000  540 -19002 0
 18998  18999 -19000  540 -19003 0

c  0-1 --> -1
c    (-b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧ -p_540) -> ( b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0)
c  in CNF:
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨  b^{90, 7}_2
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_1
c     b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨  b^{90, 7}_0
c  in DIMACS:
 18998  18999  19000  540  19001 0
 18998  18999  19000  540 -19002 0
 18998  18999  19000  540  19003 0

c  -1-1 --> -2
c    ( b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧  b^{90, 6}_0 ∧ -p_540) -> ( b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0)
c  in CNF:
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨  b^{90, 7}_2
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨  b^{90, 7}_1
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨  p_540 ∨ -b^{90, 7}_0
c  in DIMACS:
-18998  18999 -19000  540  19001 0
-18998  18999 -19000  540  19002 0
-18998  18999 -19000  540 -19003 0

c  -2-1 --> break 
c    ( b^{90, 6}_2 ∧  b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨  b^{90, 6}_0 ∨  p_540 ∨ break
c  in DIMACS:
-18998 -18999  19000  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 6}_2 ∧ -b^{90, 6}_1 ∧ -b^{90, 6}_0 ∧ true) 
c  in CNF:
c    -b^{90, 6}_2 ∨  b^{90, 6}_1 ∨  b^{90, 6}_0 ∨ false 
c  in DIMACS:
-18998  18999  19000  0

c  3 does not represent an automaton state.
c    -(-b^{90, 6}_2 ∧  b^{90, 6}_1 ∧  b^{90, 6}_0 ∧ true) 
c  in CNF:
c     b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ false 
c  in DIMACS:
 18998 -18999 -19000  0
c  -3 does not represent an automaton state.
c    -( b^{90, 6}_2 ∧  b^{90, 6}_1 ∧  b^{90, 6}_0 ∧ true) 
c  in CNF:
c    -b^{90, 6}_2 ∨ -b^{90, 6}_1 ∨ -b^{90, 6}_0 ∨ false 
c  in DIMACS:
-18998 -18999 -19000  0

c i = 7
c  -2+1 --> -1
c    ( b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧  p_630) -> ( b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0)
c  in CNF:
c    -b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨  b^{90, 8}_2
c    -b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_1
c    -b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨  b^{90, 8}_0
c  in DIMACS:
-19001 -19002  19003 -630  19004 0
-19001 -19002  19003 -630 -19005 0
-19001 -19002  19003 -630  19006 0

c  -1+1 --> 0
c    ( b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0 ∧  p_630) -> (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧ -b^{90, 8}_0)
c  in CNF:
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_2
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_1
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_0
c  in DIMACS:
-19001  19002 -19003 -630 -19004 0
-19001  19002 -19003 -630 -19005 0
-19001  19002 -19003 -630 -19006 0

c  0+1 --> 1
c    (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧  p_630) -> (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0)
c  in CNF:
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_2
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_1
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨  b^{90, 8}_0
c  in DIMACS:
 19001  19002  19003 -630 -19004 0
 19001  19002  19003 -630 -19005 0
 19001  19002  19003 -630  19006 0

c  1+1 --> 2
c    (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0 ∧  p_630) -> (-b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0)
c  in CNF:
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_2
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨  b^{90, 8}_1
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ -p_630 ∨ -b^{90, 8}_0
c  in DIMACS:
 19001  19002 -19003 -630 -19004 0
 19001  19002 -19003 -630  19005 0
 19001  19002 -19003 -630 -19006 0

c  2+1 --> break 
c    (-b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧  p_630) -> break
c  in CNF:
c     b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 19001 -19002  19003 -630 1162 0


c  2-1 --> 1
c    (-b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧ -p_630) -> (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0)
c  in CNF:
c     b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_2
c     b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_1
c     b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨  b^{90, 8}_0
c  in DIMACS:
 19001 -19002  19003  630 -19004 0
 19001 -19002  19003  630 -19005 0
 19001 -19002  19003  630  19006 0

c  1-1 --> 0
c    (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0 ∧ -p_630) -> (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧ -b^{90, 8}_0)
c  in CNF:
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_2
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_1
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_0
c  in DIMACS:
 19001  19002 -19003  630 -19004 0
 19001  19002 -19003  630 -19005 0
 19001  19002 -19003  630 -19006 0

c  0-1 --> -1
c    (-b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧ -p_630) -> ( b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0)
c  in CNF:
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨  b^{90, 8}_2
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_1
c     b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨  b^{90, 8}_0
c  in DIMACS:
 19001  19002  19003  630  19004 0
 19001  19002  19003  630 -19005 0
 19001  19002  19003  630  19006 0

c  -1-1 --> -2
c    ( b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧  b^{90, 7}_0 ∧ -p_630) -> ( b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0)
c  in CNF:
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨  b^{90, 8}_2
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨  b^{90, 8}_1
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨  p_630 ∨ -b^{90, 8}_0
c  in DIMACS:
-19001  19002 -19003  630  19004 0
-19001  19002 -19003  630  19005 0
-19001  19002 -19003  630 -19006 0

c  -2-1 --> break 
c    ( b^{90, 7}_2 ∧  b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨  b^{90, 7}_0 ∨  p_630 ∨ break
c  in DIMACS:
-19001 -19002  19003  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 7}_2 ∧ -b^{90, 7}_1 ∧ -b^{90, 7}_0 ∧ true) 
c  in CNF:
c    -b^{90, 7}_2 ∨  b^{90, 7}_1 ∨  b^{90, 7}_0 ∨ false 
c  in DIMACS:
-19001  19002  19003  0

c  3 does not represent an automaton state.
c    -(-b^{90, 7}_2 ∧  b^{90, 7}_1 ∧  b^{90, 7}_0 ∧ true) 
c  in CNF:
c     b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ false 
c  in DIMACS:
 19001 -19002 -19003  0
c  -3 does not represent an automaton state.
c    -( b^{90, 7}_2 ∧  b^{90, 7}_1 ∧  b^{90, 7}_0 ∧ true) 
c  in CNF:
c    -b^{90, 7}_2 ∨ -b^{90, 7}_1 ∨ -b^{90, 7}_0 ∨ false 
c  in DIMACS:
-19001 -19002 -19003  0

c i = 8
c  -2+1 --> -1
c    ( b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧  p_720) -> ( b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0)
c  in CNF:
c    -b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨  b^{90, 9}_2
c    -b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_1
c    -b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨  b^{90, 9}_0
c  in DIMACS:
-19004 -19005  19006 -720  19007 0
-19004 -19005  19006 -720 -19008 0
-19004 -19005  19006 -720  19009 0

c  -1+1 --> 0
c    ( b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0 ∧  p_720) -> (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧ -b^{90, 9}_0)
c  in CNF:
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_2
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_1
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_0
c  in DIMACS:
-19004  19005 -19006 -720 -19007 0
-19004  19005 -19006 -720 -19008 0
-19004  19005 -19006 -720 -19009 0

c  0+1 --> 1
c    (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧  p_720) -> (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0)
c  in CNF:
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_2
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_1
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨  b^{90, 9}_0
c  in DIMACS:
 19004  19005  19006 -720 -19007 0
 19004  19005  19006 -720 -19008 0
 19004  19005  19006 -720  19009 0

c  1+1 --> 2
c    (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0 ∧  p_720) -> (-b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0)
c  in CNF:
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_2
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨  b^{90, 9}_1
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ -p_720 ∨ -b^{90, 9}_0
c  in DIMACS:
 19004  19005 -19006 -720 -19007 0
 19004  19005 -19006 -720  19008 0
 19004  19005 -19006 -720 -19009 0

c  2+1 --> break 
c    (-b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧  p_720) -> break
c  in CNF:
c     b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 19004 -19005  19006 -720 1162 0


c  2-1 --> 1
c    (-b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧ -p_720) -> (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0)
c  in CNF:
c     b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_2
c     b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_1
c     b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨  b^{90, 9}_0
c  in DIMACS:
 19004 -19005  19006  720 -19007 0
 19004 -19005  19006  720 -19008 0
 19004 -19005  19006  720  19009 0

c  1-1 --> 0
c    (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0 ∧ -p_720) -> (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧ -b^{90, 9}_0)
c  in CNF:
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_2
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_1
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_0
c  in DIMACS:
 19004  19005 -19006  720 -19007 0
 19004  19005 -19006  720 -19008 0
 19004  19005 -19006  720 -19009 0

c  0-1 --> -1
c    (-b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧ -p_720) -> ( b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0)
c  in CNF:
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨  b^{90, 9}_2
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_1
c     b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨  b^{90, 9}_0
c  in DIMACS:
 19004  19005  19006  720  19007 0
 19004  19005  19006  720 -19008 0
 19004  19005  19006  720  19009 0

c  -1-1 --> -2
c    ( b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧  b^{90, 8}_0 ∧ -p_720) -> ( b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0)
c  in CNF:
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨  b^{90, 9}_2
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨  b^{90, 9}_1
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨  p_720 ∨ -b^{90, 9}_0
c  in DIMACS:
-19004  19005 -19006  720  19007 0
-19004  19005 -19006  720  19008 0
-19004  19005 -19006  720 -19009 0

c  -2-1 --> break 
c    ( b^{90, 8}_2 ∧  b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨  b^{90, 8}_0 ∨  p_720 ∨ break
c  in DIMACS:
-19004 -19005  19006  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 8}_2 ∧ -b^{90, 8}_1 ∧ -b^{90, 8}_0 ∧ true) 
c  in CNF:
c    -b^{90, 8}_2 ∨  b^{90, 8}_1 ∨  b^{90, 8}_0 ∨ false 
c  in DIMACS:
-19004  19005  19006  0

c  3 does not represent an automaton state.
c    -(-b^{90, 8}_2 ∧  b^{90, 8}_1 ∧  b^{90, 8}_0 ∧ true) 
c  in CNF:
c     b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ false 
c  in DIMACS:
 19004 -19005 -19006  0
c  -3 does not represent an automaton state.
c    -( b^{90, 8}_2 ∧  b^{90, 8}_1 ∧  b^{90, 8}_0 ∧ true) 
c  in CNF:
c    -b^{90, 8}_2 ∨ -b^{90, 8}_1 ∨ -b^{90, 8}_0 ∨ false 
c  in DIMACS:
-19004 -19005 -19006  0

c i = 9
c  -2+1 --> -1
c    ( b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧  p_810) -> ( b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0)
c  in CNF:
c    -b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨  b^{90, 10}_2
c    -b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_1
c    -b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨  b^{90, 10}_0
c  in DIMACS:
-19007 -19008  19009 -810  19010 0
-19007 -19008  19009 -810 -19011 0
-19007 -19008  19009 -810  19012 0

c  -1+1 --> 0
c    ( b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0 ∧  p_810) -> (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧ -b^{90, 10}_0)
c  in CNF:
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_2
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_1
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_0
c  in DIMACS:
-19007  19008 -19009 -810 -19010 0
-19007  19008 -19009 -810 -19011 0
-19007  19008 -19009 -810 -19012 0

c  0+1 --> 1
c    (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧  p_810) -> (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0)
c  in CNF:
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_2
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_1
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨  b^{90, 10}_0
c  in DIMACS:
 19007  19008  19009 -810 -19010 0
 19007  19008  19009 -810 -19011 0
 19007  19008  19009 -810  19012 0

c  1+1 --> 2
c    (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0 ∧  p_810) -> (-b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0)
c  in CNF:
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_2
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨  b^{90, 10}_1
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ -p_810 ∨ -b^{90, 10}_0
c  in DIMACS:
 19007  19008 -19009 -810 -19010 0
 19007  19008 -19009 -810  19011 0
 19007  19008 -19009 -810 -19012 0

c  2+1 --> break 
c    (-b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧  p_810) -> break
c  in CNF:
c     b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 19007 -19008  19009 -810 1162 0


c  2-1 --> 1
c    (-b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧ -p_810) -> (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0)
c  in CNF:
c     b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_2
c     b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_1
c     b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨  b^{90, 10}_0
c  in DIMACS:
 19007 -19008  19009  810 -19010 0
 19007 -19008  19009  810 -19011 0
 19007 -19008  19009  810  19012 0

c  1-1 --> 0
c    (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0 ∧ -p_810) -> (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧ -b^{90, 10}_0)
c  in CNF:
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_2
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_1
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_0
c  in DIMACS:
 19007  19008 -19009  810 -19010 0
 19007  19008 -19009  810 -19011 0
 19007  19008 -19009  810 -19012 0

c  0-1 --> -1
c    (-b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧ -p_810) -> ( b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0)
c  in CNF:
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨  b^{90, 10}_2
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_1
c     b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨  b^{90, 10}_0
c  in DIMACS:
 19007  19008  19009  810  19010 0
 19007  19008  19009  810 -19011 0
 19007  19008  19009  810  19012 0

c  -1-1 --> -2
c    ( b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧  b^{90, 9}_0 ∧ -p_810) -> ( b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0)
c  in CNF:
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨  b^{90, 10}_2
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨  b^{90, 10}_1
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨  p_810 ∨ -b^{90, 10}_0
c  in DIMACS:
-19007  19008 -19009  810  19010 0
-19007  19008 -19009  810  19011 0
-19007  19008 -19009  810 -19012 0

c  -2-1 --> break 
c    ( b^{90, 9}_2 ∧  b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨  b^{90, 9}_0 ∨  p_810 ∨ break
c  in DIMACS:
-19007 -19008  19009  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 9}_2 ∧ -b^{90, 9}_1 ∧ -b^{90, 9}_0 ∧ true) 
c  in CNF:
c    -b^{90, 9}_2 ∨  b^{90, 9}_1 ∨  b^{90, 9}_0 ∨ false 
c  in DIMACS:
-19007  19008  19009  0

c  3 does not represent an automaton state.
c    -(-b^{90, 9}_2 ∧  b^{90, 9}_1 ∧  b^{90, 9}_0 ∧ true) 
c  in CNF:
c     b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ false 
c  in DIMACS:
 19007 -19008 -19009  0
c  -3 does not represent an automaton state.
c    -( b^{90, 9}_2 ∧  b^{90, 9}_1 ∧  b^{90, 9}_0 ∧ true) 
c  in CNF:
c    -b^{90, 9}_2 ∨ -b^{90, 9}_1 ∨ -b^{90, 9}_0 ∨ false 
c  in DIMACS:
-19007 -19008 -19009  0

c i = 10
c  -2+1 --> -1
c    ( b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧  p_900) -> ( b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0)
c  in CNF:
c    -b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨  b^{90, 11}_2
c    -b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_1
c    -b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨  b^{90, 11}_0
c  in DIMACS:
-19010 -19011  19012 -900  19013 0
-19010 -19011  19012 -900 -19014 0
-19010 -19011  19012 -900  19015 0

c  -1+1 --> 0
c    ( b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0 ∧  p_900) -> (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧ -b^{90, 11}_0)
c  in CNF:
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_2
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_1
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_0
c  in DIMACS:
-19010  19011 -19012 -900 -19013 0
-19010  19011 -19012 -900 -19014 0
-19010  19011 -19012 -900 -19015 0

c  0+1 --> 1
c    (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧  p_900) -> (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0)
c  in CNF:
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_2
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_1
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨  b^{90, 11}_0
c  in DIMACS:
 19010  19011  19012 -900 -19013 0
 19010  19011  19012 -900 -19014 0
 19010  19011  19012 -900  19015 0

c  1+1 --> 2
c    (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0 ∧  p_900) -> (-b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0)
c  in CNF:
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_2
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨  b^{90, 11}_1
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ -p_900 ∨ -b^{90, 11}_0
c  in DIMACS:
 19010  19011 -19012 -900 -19013 0
 19010  19011 -19012 -900  19014 0
 19010  19011 -19012 -900 -19015 0

c  2+1 --> break 
c    (-b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧  p_900) -> break
c  in CNF:
c     b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 19010 -19011  19012 -900 1162 0


c  2-1 --> 1
c    (-b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧ -p_900) -> (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0)
c  in CNF:
c     b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_2
c     b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_1
c     b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨  b^{90, 11}_0
c  in DIMACS:
 19010 -19011  19012  900 -19013 0
 19010 -19011  19012  900 -19014 0
 19010 -19011  19012  900  19015 0

c  1-1 --> 0
c    (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0 ∧ -p_900) -> (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧ -b^{90, 11}_0)
c  in CNF:
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_2
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_1
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_0
c  in DIMACS:
 19010  19011 -19012  900 -19013 0
 19010  19011 -19012  900 -19014 0
 19010  19011 -19012  900 -19015 0

c  0-1 --> -1
c    (-b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧ -p_900) -> ( b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0)
c  in CNF:
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨  b^{90, 11}_2
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_1
c     b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨  b^{90, 11}_0
c  in DIMACS:
 19010  19011  19012  900  19013 0
 19010  19011  19012  900 -19014 0
 19010  19011  19012  900  19015 0

c  -1-1 --> -2
c    ( b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧  b^{90, 10}_0 ∧ -p_900) -> ( b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0)
c  in CNF:
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨  b^{90, 11}_2
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨  b^{90, 11}_1
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨  p_900 ∨ -b^{90, 11}_0
c  in DIMACS:
-19010  19011 -19012  900  19013 0
-19010  19011 -19012  900  19014 0
-19010  19011 -19012  900 -19015 0

c  -2-1 --> break 
c    ( b^{90, 10}_2 ∧  b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨  b^{90, 10}_0 ∨  p_900 ∨ break
c  in DIMACS:
-19010 -19011  19012  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 10}_2 ∧ -b^{90, 10}_1 ∧ -b^{90, 10}_0 ∧ true) 
c  in CNF:
c    -b^{90, 10}_2 ∨  b^{90, 10}_1 ∨  b^{90, 10}_0 ∨ false 
c  in DIMACS:
-19010  19011  19012  0

c  3 does not represent an automaton state.
c    -(-b^{90, 10}_2 ∧  b^{90, 10}_1 ∧  b^{90, 10}_0 ∧ true) 
c  in CNF:
c     b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ false 
c  in DIMACS:
 19010 -19011 -19012  0
c  -3 does not represent an automaton state.
c    -( b^{90, 10}_2 ∧  b^{90, 10}_1 ∧  b^{90, 10}_0 ∧ true) 
c  in CNF:
c    -b^{90, 10}_2 ∨ -b^{90, 10}_1 ∨ -b^{90, 10}_0 ∨ false 
c  in DIMACS:
-19010 -19011 -19012  0

c i = 11
c  -2+1 --> -1
c    ( b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧  p_990) -> ( b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0)
c  in CNF:
c    -b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨  b^{90, 12}_2
c    -b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_1
c    -b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨  b^{90, 12}_0
c  in DIMACS:
-19013 -19014  19015 -990  19016 0
-19013 -19014  19015 -990 -19017 0
-19013 -19014  19015 -990  19018 0

c  -1+1 --> 0
c    ( b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0 ∧  p_990) -> (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧ -b^{90, 12}_0)
c  in CNF:
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_2
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_1
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_0
c  in DIMACS:
-19013  19014 -19015 -990 -19016 0
-19013  19014 -19015 -990 -19017 0
-19013  19014 -19015 -990 -19018 0

c  0+1 --> 1
c    (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧  p_990) -> (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0)
c  in CNF:
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_2
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_1
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨  b^{90, 12}_0
c  in DIMACS:
 19013  19014  19015 -990 -19016 0
 19013  19014  19015 -990 -19017 0
 19013  19014  19015 -990  19018 0

c  1+1 --> 2
c    (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0 ∧  p_990) -> (-b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0)
c  in CNF:
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_2
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨  b^{90, 12}_1
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ -p_990 ∨ -b^{90, 12}_0
c  in DIMACS:
 19013  19014 -19015 -990 -19016 0
 19013  19014 -19015 -990  19017 0
 19013  19014 -19015 -990 -19018 0

c  2+1 --> break 
c    (-b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧  p_990) -> break
c  in CNF:
c     b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 19013 -19014  19015 -990 1162 0


c  2-1 --> 1
c    (-b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧ -p_990) -> (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0)
c  in CNF:
c     b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_2
c     b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_1
c     b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨  b^{90, 12}_0
c  in DIMACS:
 19013 -19014  19015  990 -19016 0
 19013 -19014  19015  990 -19017 0
 19013 -19014  19015  990  19018 0

c  1-1 --> 0
c    (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0 ∧ -p_990) -> (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧ -b^{90, 12}_0)
c  in CNF:
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_2
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_1
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_0
c  in DIMACS:
 19013  19014 -19015  990 -19016 0
 19013  19014 -19015  990 -19017 0
 19013  19014 -19015  990 -19018 0

c  0-1 --> -1
c    (-b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧ -p_990) -> ( b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0)
c  in CNF:
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨  b^{90, 12}_2
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_1
c     b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨  b^{90, 12}_0
c  in DIMACS:
 19013  19014  19015  990  19016 0
 19013  19014  19015  990 -19017 0
 19013  19014  19015  990  19018 0

c  -1-1 --> -2
c    ( b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧  b^{90, 11}_0 ∧ -p_990) -> ( b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0)
c  in CNF:
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨  b^{90, 12}_2
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨  b^{90, 12}_1
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨  p_990 ∨ -b^{90, 12}_0
c  in DIMACS:
-19013  19014 -19015  990  19016 0
-19013  19014 -19015  990  19017 0
-19013  19014 -19015  990 -19018 0

c  -2-1 --> break 
c    ( b^{90, 11}_2 ∧  b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨  b^{90, 11}_0 ∨  p_990 ∨ break
c  in DIMACS:
-19013 -19014  19015  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 11}_2 ∧ -b^{90, 11}_1 ∧ -b^{90, 11}_0 ∧ true) 
c  in CNF:
c    -b^{90, 11}_2 ∨  b^{90, 11}_1 ∨  b^{90, 11}_0 ∨ false 
c  in DIMACS:
-19013  19014  19015  0

c  3 does not represent an automaton state.
c    -(-b^{90, 11}_2 ∧  b^{90, 11}_1 ∧  b^{90, 11}_0 ∧ true) 
c  in CNF:
c     b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ false 
c  in DIMACS:
 19013 -19014 -19015  0
c  -3 does not represent an automaton state.
c    -( b^{90, 11}_2 ∧  b^{90, 11}_1 ∧  b^{90, 11}_0 ∧ true) 
c  in CNF:
c    -b^{90, 11}_2 ∨ -b^{90, 11}_1 ∨ -b^{90, 11}_0 ∨ false 
c  in DIMACS:
-19013 -19014 -19015  0

c i = 12
c  -2+1 --> -1
c    ( b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧  p_1080) -> ( b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧  b^{90, 13}_0)
c  in CNF:
c    -b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨  b^{90, 13}_2
c    -b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_1
c    -b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨  b^{90, 13}_0
c  in DIMACS:
-19016 -19017  19018 -1080  19019 0
-19016 -19017  19018 -1080 -19020 0
-19016 -19017  19018 -1080  19021 0

c  -1+1 --> 0
c    ( b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0 ∧  p_1080) -> (-b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧ -b^{90, 13}_0)
c  in CNF:
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_2
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_1
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_0
c  in DIMACS:
-19016  19017 -19018 -1080 -19019 0
-19016  19017 -19018 -1080 -19020 0
-19016  19017 -19018 -1080 -19021 0

c  0+1 --> 1
c    (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧  p_1080) -> (-b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧  b^{90, 13}_0)
c  in CNF:
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_2
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_1
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨  b^{90, 13}_0
c  in DIMACS:
 19016  19017  19018 -1080 -19019 0
 19016  19017  19018 -1080 -19020 0
 19016  19017  19018 -1080  19021 0

c  1+1 --> 2
c    (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0 ∧  p_1080) -> (-b^{90, 13}_2 ∧  b^{90, 13}_1 ∧ -b^{90, 13}_0)
c  in CNF:
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_2
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨  b^{90, 13}_1
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ -p_1080 ∨ -b^{90, 13}_0
c  in DIMACS:
 19016  19017 -19018 -1080 -19019 0
 19016  19017 -19018 -1080  19020 0
 19016  19017 -19018 -1080 -19021 0

c  2+1 --> break 
c    (-b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 19016 -19017  19018 -1080 1162 0


c  2-1 --> 1
c    (-b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧ -p_1080) -> (-b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧  b^{90, 13}_0)
c  in CNF:
c     b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_2
c     b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_1
c     b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨  b^{90, 13}_0
c  in DIMACS:
 19016 -19017  19018  1080 -19019 0
 19016 -19017  19018  1080 -19020 0
 19016 -19017  19018  1080  19021 0

c  1-1 --> 0
c    (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0 ∧ -p_1080) -> (-b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧ -b^{90, 13}_0)
c  in CNF:
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_2
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_1
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_0
c  in DIMACS:
 19016  19017 -19018  1080 -19019 0
 19016  19017 -19018  1080 -19020 0
 19016  19017 -19018  1080 -19021 0

c  0-1 --> -1
c    (-b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧ -p_1080) -> ( b^{90, 13}_2 ∧ -b^{90, 13}_1 ∧  b^{90, 13}_0)
c  in CNF:
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨  b^{90, 13}_2
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_1
c     b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨  b^{90, 13}_0
c  in DIMACS:
 19016  19017  19018  1080  19019 0
 19016  19017  19018  1080 -19020 0
 19016  19017  19018  1080  19021 0

c  -1-1 --> -2
c    ( b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧  b^{90, 12}_0 ∧ -p_1080) -> ( b^{90, 13}_2 ∧  b^{90, 13}_1 ∧ -b^{90, 13}_0)
c  in CNF:
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨  b^{90, 13}_2
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨  b^{90, 13}_1
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨  p_1080 ∨ -b^{90, 13}_0
c  in DIMACS:
-19016  19017 -19018  1080  19019 0
-19016  19017 -19018  1080  19020 0
-19016  19017 -19018  1080 -19021 0

c  -2-1 --> break 
c    ( b^{90, 12}_2 ∧  b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨  b^{90, 12}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-19016 -19017  19018  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{90, 12}_2 ∧ -b^{90, 12}_1 ∧ -b^{90, 12}_0 ∧ true) 
c  in CNF:
c    -b^{90, 12}_2 ∨  b^{90, 12}_1 ∨  b^{90, 12}_0 ∨ false 
c  in DIMACS:
-19016  19017  19018  0

c  3 does not represent an automaton state.
c    -(-b^{90, 12}_2 ∧  b^{90, 12}_1 ∧  b^{90, 12}_0 ∧ true) 
c  in CNF:
c     b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ false 
c  in DIMACS:
 19016 -19017 -19018  0
c  -3 does not represent an automaton state.
c    -( b^{90, 12}_2 ∧  b^{90, 12}_1 ∧  b^{90, 12}_0 ∧ true) 
c  in CNF:
c    -b^{90, 12}_2 ∨ -b^{90, 12}_1 ∨ -b^{90, 12}_0 ∨ false 
c  in DIMACS:
-19016 -19017 -19018  0

c INIT for k = 91
c    -b^{91, 1}_2
c    -b^{91, 1}_1
c    -b^{91, 1}_0
c  in DIMACS:
-19022 0
-19023 0
-19024 0

c Transitions for k = 91
c i = 1
c  -2+1 --> -1
c    ( b^{91, 1}_2 ∧  b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧  p_91) -> ( b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0)
c  in CNF:
c    -b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨  b^{91, 2}_2
c    -b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_1
c    -b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨  b^{91, 2}_0
c  in DIMACS:
-19022 -19023  19024 -91  19025 0
-19022 -19023  19024 -91 -19026 0
-19022 -19023  19024 -91  19027 0

c  -1+1 --> 0
c    ( b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧  b^{91, 1}_0 ∧  p_91) -> (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧ -b^{91, 2}_0)
c  in CNF:
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_2
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_1
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_0
c  in DIMACS:
-19022  19023 -19024 -91 -19025 0
-19022  19023 -19024 -91 -19026 0
-19022  19023 -19024 -91 -19027 0

c  0+1 --> 1
c    (-b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧  p_91) -> (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0)
c  in CNF:
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_2
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_1
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨  b^{91, 2}_0
c  in DIMACS:
 19022  19023  19024 -91 -19025 0
 19022  19023  19024 -91 -19026 0
 19022  19023  19024 -91  19027 0

c  1+1 --> 2
c    (-b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧  b^{91, 1}_0 ∧  p_91) -> (-b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0)
c  in CNF:
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_2
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨  b^{91, 2}_1
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ -p_91 ∨ -b^{91, 2}_0
c  in DIMACS:
 19022  19023 -19024 -91 -19025 0
 19022  19023 -19024 -91  19026 0
 19022  19023 -19024 -91 -19027 0

c  2+1 --> break 
c    (-b^{91, 1}_2 ∧  b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧  p_91) -> break
c  in CNF:
c     b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ -p_91 ∨ break
c  in DIMACS:
 19022 -19023  19024 -91 1162 0


c  2-1 --> 1
c    (-b^{91, 1}_2 ∧  b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧ -p_91) -> (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0)
c  in CNF:
c     b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_2
c     b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_1
c     b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨  b^{91, 2}_0
c  in DIMACS:
 19022 -19023  19024  91 -19025 0
 19022 -19023  19024  91 -19026 0
 19022 -19023  19024  91  19027 0

c  1-1 --> 0
c    (-b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧  b^{91, 1}_0 ∧ -p_91) -> (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧ -b^{91, 2}_0)
c  in CNF:
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_2
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_1
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_0
c  in DIMACS:
 19022  19023 -19024  91 -19025 0
 19022  19023 -19024  91 -19026 0
 19022  19023 -19024  91 -19027 0

c  0-1 --> -1
c    (-b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧ -p_91) -> ( b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0)
c  in CNF:
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨  b^{91, 2}_2
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_1
c     b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨  b^{91, 2}_0
c  in DIMACS:
 19022  19023  19024  91  19025 0
 19022  19023  19024  91 -19026 0
 19022  19023  19024  91  19027 0

c  -1-1 --> -2
c    ( b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧  b^{91, 1}_0 ∧ -p_91) -> ( b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0)
c  in CNF:
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨  b^{91, 2}_2
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨  b^{91, 2}_1
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨  p_91 ∨ -b^{91, 2}_0
c  in DIMACS:
-19022  19023 -19024  91  19025 0
-19022  19023 -19024  91  19026 0
-19022  19023 -19024  91 -19027 0

c  -2-1 --> break 
c    ( b^{91, 1}_2 ∧  b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧ -p_91) -> break
c  in CNF:
c    -b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨  b^{91, 1}_0 ∨  p_91 ∨ break
c  in DIMACS:
-19022 -19023  19024  91 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 1}_2 ∧ -b^{91, 1}_1 ∧ -b^{91, 1}_0 ∧ true) 
c  in CNF:
c    -b^{91, 1}_2 ∨  b^{91, 1}_1 ∨  b^{91, 1}_0 ∨ false 
c  in DIMACS:
-19022  19023  19024  0

c  3 does not represent an automaton state.
c    -(-b^{91, 1}_2 ∧  b^{91, 1}_1 ∧  b^{91, 1}_0 ∧ true) 
c  in CNF:
c     b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ false 
c  in DIMACS:
 19022 -19023 -19024  0
c  -3 does not represent an automaton state.
c    -( b^{91, 1}_2 ∧  b^{91, 1}_1 ∧  b^{91, 1}_0 ∧ true) 
c  in CNF:
c    -b^{91, 1}_2 ∨ -b^{91, 1}_1 ∨ -b^{91, 1}_0 ∨ false 
c  in DIMACS:
-19022 -19023 -19024  0

c i = 2
c  -2+1 --> -1
c    ( b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧  p_182) -> ( b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0)
c  in CNF:
c    -b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨  b^{91, 3}_2
c    -b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_1
c    -b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨  b^{91, 3}_0
c  in DIMACS:
-19025 -19026  19027 -182  19028 0
-19025 -19026  19027 -182 -19029 0
-19025 -19026  19027 -182  19030 0

c  -1+1 --> 0
c    ( b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0 ∧  p_182) -> (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧ -b^{91, 3}_0)
c  in CNF:
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_2
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_1
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_0
c  in DIMACS:
-19025  19026 -19027 -182 -19028 0
-19025  19026 -19027 -182 -19029 0
-19025  19026 -19027 -182 -19030 0

c  0+1 --> 1
c    (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧  p_182) -> (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0)
c  in CNF:
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_2
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_1
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨  b^{91, 3}_0
c  in DIMACS:
 19025  19026  19027 -182 -19028 0
 19025  19026  19027 -182 -19029 0
 19025  19026  19027 -182  19030 0

c  1+1 --> 2
c    (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0 ∧  p_182) -> (-b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0)
c  in CNF:
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_2
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨  b^{91, 3}_1
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ -p_182 ∨ -b^{91, 3}_0
c  in DIMACS:
 19025  19026 -19027 -182 -19028 0
 19025  19026 -19027 -182  19029 0
 19025  19026 -19027 -182 -19030 0

c  2+1 --> break 
c    (-b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧  p_182) -> break
c  in CNF:
c     b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 19025 -19026  19027 -182 1162 0


c  2-1 --> 1
c    (-b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧ -p_182) -> (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0)
c  in CNF:
c     b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_2
c     b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_1
c     b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨  b^{91, 3}_0
c  in DIMACS:
 19025 -19026  19027  182 -19028 0
 19025 -19026  19027  182 -19029 0
 19025 -19026  19027  182  19030 0

c  1-1 --> 0
c    (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0 ∧ -p_182) -> (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧ -b^{91, 3}_0)
c  in CNF:
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_2
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_1
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_0
c  in DIMACS:
 19025  19026 -19027  182 -19028 0
 19025  19026 -19027  182 -19029 0
 19025  19026 -19027  182 -19030 0

c  0-1 --> -1
c    (-b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧ -p_182) -> ( b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0)
c  in CNF:
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨  b^{91, 3}_2
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_1
c     b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨  b^{91, 3}_0
c  in DIMACS:
 19025  19026  19027  182  19028 0
 19025  19026  19027  182 -19029 0
 19025  19026  19027  182  19030 0

c  -1-1 --> -2
c    ( b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧  b^{91, 2}_0 ∧ -p_182) -> ( b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0)
c  in CNF:
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨  b^{91, 3}_2
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨  b^{91, 3}_1
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨  p_182 ∨ -b^{91, 3}_0
c  in DIMACS:
-19025  19026 -19027  182  19028 0
-19025  19026 -19027  182  19029 0
-19025  19026 -19027  182 -19030 0

c  -2-1 --> break 
c    ( b^{91, 2}_2 ∧  b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨  b^{91, 2}_0 ∨  p_182 ∨ break
c  in DIMACS:
-19025 -19026  19027  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 2}_2 ∧ -b^{91, 2}_1 ∧ -b^{91, 2}_0 ∧ true) 
c  in CNF:
c    -b^{91, 2}_2 ∨  b^{91, 2}_1 ∨  b^{91, 2}_0 ∨ false 
c  in DIMACS:
-19025  19026  19027  0

c  3 does not represent an automaton state.
c    -(-b^{91, 2}_2 ∧  b^{91, 2}_1 ∧  b^{91, 2}_0 ∧ true) 
c  in CNF:
c     b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ false 
c  in DIMACS:
 19025 -19026 -19027  0
c  -3 does not represent an automaton state.
c    -( b^{91, 2}_2 ∧  b^{91, 2}_1 ∧  b^{91, 2}_0 ∧ true) 
c  in CNF:
c    -b^{91, 2}_2 ∨ -b^{91, 2}_1 ∨ -b^{91, 2}_0 ∨ false 
c  in DIMACS:
-19025 -19026 -19027  0

c i = 3
c  -2+1 --> -1
c    ( b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧  p_273) -> ( b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0)
c  in CNF:
c    -b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨  b^{91, 4}_2
c    -b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_1
c    -b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨  b^{91, 4}_0
c  in DIMACS:
-19028 -19029  19030 -273  19031 0
-19028 -19029  19030 -273 -19032 0
-19028 -19029  19030 -273  19033 0

c  -1+1 --> 0
c    ( b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0 ∧  p_273) -> (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧ -b^{91, 4}_0)
c  in CNF:
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_2
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_1
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_0
c  in DIMACS:
-19028  19029 -19030 -273 -19031 0
-19028  19029 -19030 -273 -19032 0
-19028  19029 -19030 -273 -19033 0

c  0+1 --> 1
c    (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧  p_273) -> (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0)
c  in CNF:
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_2
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_1
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨  b^{91, 4}_0
c  in DIMACS:
 19028  19029  19030 -273 -19031 0
 19028  19029  19030 -273 -19032 0
 19028  19029  19030 -273  19033 0

c  1+1 --> 2
c    (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0 ∧  p_273) -> (-b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0)
c  in CNF:
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_2
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨  b^{91, 4}_1
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ -p_273 ∨ -b^{91, 4}_0
c  in DIMACS:
 19028  19029 -19030 -273 -19031 0
 19028  19029 -19030 -273  19032 0
 19028  19029 -19030 -273 -19033 0

c  2+1 --> break 
c    (-b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧  p_273) -> break
c  in CNF:
c     b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 19028 -19029  19030 -273 1162 0


c  2-1 --> 1
c    (-b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧ -p_273) -> (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0)
c  in CNF:
c     b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_2
c     b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_1
c     b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨  b^{91, 4}_0
c  in DIMACS:
 19028 -19029  19030  273 -19031 0
 19028 -19029  19030  273 -19032 0
 19028 -19029  19030  273  19033 0

c  1-1 --> 0
c    (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0 ∧ -p_273) -> (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧ -b^{91, 4}_0)
c  in CNF:
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_2
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_1
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_0
c  in DIMACS:
 19028  19029 -19030  273 -19031 0
 19028  19029 -19030  273 -19032 0
 19028  19029 -19030  273 -19033 0

c  0-1 --> -1
c    (-b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧ -p_273) -> ( b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0)
c  in CNF:
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨  b^{91, 4}_2
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_1
c     b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨  b^{91, 4}_0
c  in DIMACS:
 19028  19029  19030  273  19031 0
 19028  19029  19030  273 -19032 0
 19028  19029  19030  273  19033 0

c  -1-1 --> -2
c    ( b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧  b^{91, 3}_0 ∧ -p_273) -> ( b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0)
c  in CNF:
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨  b^{91, 4}_2
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨  b^{91, 4}_1
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨  p_273 ∨ -b^{91, 4}_0
c  in DIMACS:
-19028  19029 -19030  273  19031 0
-19028  19029 -19030  273  19032 0
-19028  19029 -19030  273 -19033 0

c  -2-1 --> break 
c    ( b^{91, 3}_2 ∧  b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨  b^{91, 3}_0 ∨  p_273 ∨ break
c  in DIMACS:
-19028 -19029  19030  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 3}_2 ∧ -b^{91, 3}_1 ∧ -b^{91, 3}_0 ∧ true) 
c  in CNF:
c    -b^{91, 3}_2 ∨  b^{91, 3}_1 ∨  b^{91, 3}_0 ∨ false 
c  in DIMACS:
-19028  19029  19030  0

c  3 does not represent an automaton state.
c    -(-b^{91, 3}_2 ∧  b^{91, 3}_1 ∧  b^{91, 3}_0 ∧ true) 
c  in CNF:
c     b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ false 
c  in DIMACS:
 19028 -19029 -19030  0
c  -3 does not represent an automaton state.
c    -( b^{91, 3}_2 ∧  b^{91, 3}_1 ∧  b^{91, 3}_0 ∧ true) 
c  in CNF:
c    -b^{91, 3}_2 ∨ -b^{91, 3}_1 ∨ -b^{91, 3}_0 ∨ false 
c  in DIMACS:
-19028 -19029 -19030  0

c i = 4
c  -2+1 --> -1
c    ( b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧  p_364) -> ( b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0)
c  in CNF:
c    -b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨  b^{91, 5}_2
c    -b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_1
c    -b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨  b^{91, 5}_0
c  in DIMACS:
-19031 -19032  19033 -364  19034 0
-19031 -19032  19033 -364 -19035 0
-19031 -19032  19033 -364  19036 0

c  -1+1 --> 0
c    ( b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0 ∧  p_364) -> (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧ -b^{91, 5}_0)
c  in CNF:
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_2
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_1
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_0
c  in DIMACS:
-19031  19032 -19033 -364 -19034 0
-19031  19032 -19033 -364 -19035 0
-19031  19032 -19033 -364 -19036 0

c  0+1 --> 1
c    (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧  p_364) -> (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0)
c  in CNF:
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_2
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_1
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨  b^{91, 5}_0
c  in DIMACS:
 19031  19032  19033 -364 -19034 0
 19031  19032  19033 -364 -19035 0
 19031  19032  19033 -364  19036 0

c  1+1 --> 2
c    (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0 ∧  p_364) -> (-b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0)
c  in CNF:
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_2
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨  b^{91, 5}_1
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ -p_364 ∨ -b^{91, 5}_0
c  in DIMACS:
 19031  19032 -19033 -364 -19034 0
 19031  19032 -19033 -364  19035 0
 19031  19032 -19033 -364 -19036 0

c  2+1 --> break 
c    (-b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧  p_364) -> break
c  in CNF:
c     b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 19031 -19032  19033 -364 1162 0


c  2-1 --> 1
c    (-b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧ -p_364) -> (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0)
c  in CNF:
c     b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_2
c     b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_1
c     b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨  b^{91, 5}_0
c  in DIMACS:
 19031 -19032  19033  364 -19034 0
 19031 -19032  19033  364 -19035 0
 19031 -19032  19033  364  19036 0

c  1-1 --> 0
c    (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0 ∧ -p_364) -> (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧ -b^{91, 5}_0)
c  in CNF:
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_2
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_1
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_0
c  in DIMACS:
 19031  19032 -19033  364 -19034 0
 19031  19032 -19033  364 -19035 0
 19031  19032 -19033  364 -19036 0

c  0-1 --> -1
c    (-b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧ -p_364) -> ( b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0)
c  in CNF:
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨  b^{91, 5}_2
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_1
c     b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨  b^{91, 5}_0
c  in DIMACS:
 19031  19032  19033  364  19034 0
 19031  19032  19033  364 -19035 0
 19031  19032  19033  364  19036 0

c  -1-1 --> -2
c    ( b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧  b^{91, 4}_0 ∧ -p_364) -> ( b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0)
c  in CNF:
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨  b^{91, 5}_2
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨  b^{91, 5}_1
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨  p_364 ∨ -b^{91, 5}_0
c  in DIMACS:
-19031  19032 -19033  364  19034 0
-19031  19032 -19033  364  19035 0
-19031  19032 -19033  364 -19036 0

c  -2-1 --> break 
c    ( b^{91, 4}_2 ∧  b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨  b^{91, 4}_0 ∨  p_364 ∨ break
c  in DIMACS:
-19031 -19032  19033  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 4}_2 ∧ -b^{91, 4}_1 ∧ -b^{91, 4}_0 ∧ true) 
c  in CNF:
c    -b^{91, 4}_2 ∨  b^{91, 4}_1 ∨  b^{91, 4}_0 ∨ false 
c  in DIMACS:
-19031  19032  19033  0

c  3 does not represent an automaton state.
c    -(-b^{91, 4}_2 ∧  b^{91, 4}_1 ∧  b^{91, 4}_0 ∧ true) 
c  in CNF:
c     b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ false 
c  in DIMACS:
 19031 -19032 -19033  0
c  -3 does not represent an automaton state.
c    -( b^{91, 4}_2 ∧  b^{91, 4}_1 ∧  b^{91, 4}_0 ∧ true) 
c  in CNF:
c    -b^{91, 4}_2 ∨ -b^{91, 4}_1 ∨ -b^{91, 4}_0 ∨ false 
c  in DIMACS:
-19031 -19032 -19033  0

c i = 5
c  -2+1 --> -1
c    ( b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧  p_455) -> ( b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0)
c  in CNF:
c    -b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨  b^{91, 6}_2
c    -b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_1
c    -b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨  b^{91, 6}_0
c  in DIMACS:
-19034 -19035  19036 -455  19037 0
-19034 -19035  19036 -455 -19038 0
-19034 -19035  19036 -455  19039 0

c  -1+1 --> 0
c    ( b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0 ∧  p_455) -> (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧ -b^{91, 6}_0)
c  in CNF:
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_2
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_1
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_0
c  in DIMACS:
-19034  19035 -19036 -455 -19037 0
-19034  19035 -19036 -455 -19038 0
-19034  19035 -19036 -455 -19039 0

c  0+1 --> 1
c    (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧  p_455) -> (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0)
c  in CNF:
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_2
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_1
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨  b^{91, 6}_0
c  in DIMACS:
 19034  19035  19036 -455 -19037 0
 19034  19035  19036 -455 -19038 0
 19034  19035  19036 -455  19039 0

c  1+1 --> 2
c    (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0 ∧  p_455) -> (-b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0)
c  in CNF:
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_2
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨  b^{91, 6}_1
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ -p_455 ∨ -b^{91, 6}_0
c  in DIMACS:
 19034  19035 -19036 -455 -19037 0
 19034  19035 -19036 -455  19038 0
 19034  19035 -19036 -455 -19039 0

c  2+1 --> break 
c    (-b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧  p_455) -> break
c  in CNF:
c     b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ -p_455 ∨ break
c  in DIMACS:
 19034 -19035  19036 -455 1162 0


c  2-1 --> 1
c    (-b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧ -p_455) -> (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0)
c  in CNF:
c     b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_2
c     b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_1
c     b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨  b^{91, 6}_0
c  in DIMACS:
 19034 -19035  19036  455 -19037 0
 19034 -19035  19036  455 -19038 0
 19034 -19035  19036  455  19039 0

c  1-1 --> 0
c    (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0 ∧ -p_455) -> (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧ -b^{91, 6}_0)
c  in CNF:
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_2
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_1
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_0
c  in DIMACS:
 19034  19035 -19036  455 -19037 0
 19034  19035 -19036  455 -19038 0
 19034  19035 -19036  455 -19039 0

c  0-1 --> -1
c    (-b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧ -p_455) -> ( b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0)
c  in CNF:
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨  b^{91, 6}_2
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_1
c     b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨  b^{91, 6}_0
c  in DIMACS:
 19034  19035  19036  455  19037 0
 19034  19035  19036  455 -19038 0
 19034  19035  19036  455  19039 0

c  -1-1 --> -2
c    ( b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧  b^{91, 5}_0 ∧ -p_455) -> ( b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0)
c  in CNF:
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨  b^{91, 6}_2
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨  b^{91, 6}_1
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨  p_455 ∨ -b^{91, 6}_0
c  in DIMACS:
-19034  19035 -19036  455  19037 0
-19034  19035 -19036  455  19038 0
-19034  19035 -19036  455 -19039 0

c  -2-1 --> break 
c    ( b^{91, 5}_2 ∧  b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧ -p_455) -> break
c  in CNF:
c    -b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨  b^{91, 5}_0 ∨  p_455 ∨ break
c  in DIMACS:
-19034 -19035  19036  455 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 5}_2 ∧ -b^{91, 5}_1 ∧ -b^{91, 5}_0 ∧ true) 
c  in CNF:
c    -b^{91, 5}_2 ∨  b^{91, 5}_1 ∨  b^{91, 5}_0 ∨ false 
c  in DIMACS:
-19034  19035  19036  0

c  3 does not represent an automaton state.
c    -(-b^{91, 5}_2 ∧  b^{91, 5}_1 ∧  b^{91, 5}_0 ∧ true) 
c  in CNF:
c     b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ false 
c  in DIMACS:
 19034 -19035 -19036  0
c  -3 does not represent an automaton state.
c    -( b^{91, 5}_2 ∧  b^{91, 5}_1 ∧  b^{91, 5}_0 ∧ true) 
c  in CNF:
c    -b^{91, 5}_2 ∨ -b^{91, 5}_1 ∨ -b^{91, 5}_0 ∨ false 
c  in DIMACS:
-19034 -19035 -19036  0

c i = 6
c  -2+1 --> -1
c    ( b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧  p_546) -> ( b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0)
c  in CNF:
c    -b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨  b^{91, 7}_2
c    -b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_1
c    -b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨  b^{91, 7}_0
c  in DIMACS:
-19037 -19038  19039 -546  19040 0
-19037 -19038  19039 -546 -19041 0
-19037 -19038  19039 -546  19042 0

c  -1+1 --> 0
c    ( b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0 ∧  p_546) -> (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧ -b^{91, 7}_0)
c  in CNF:
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_2
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_1
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_0
c  in DIMACS:
-19037  19038 -19039 -546 -19040 0
-19037  19038 -19039 -546 -19041 0
-19037  19038 -19039 -546 -19042 0

c  0+1 --> 1
c    (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧  p_546) -> (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0)
c  in CNF:
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_2
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_1
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨  b^{91, 7}_0
c  in DIMACS:
 19037  19038  19039 -546 -19040 0
 19037  19038  19039 -546 -19041 0
 19037  19038  19039 -546  19042 0

c  1+1 --> 2
c    (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0 ∧  p_546) -> (-b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0)
c  in CNF:
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_2
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨  b^{91, 7}_1
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ -p_546 ∨ -b^{91, 7}_0
c  in DIMACS:
 19037  19038 -19039 -546 -19040 0
 19037  19038 -19039 -546  19041 0
 19037  19038 -19039 -546 -19042 0

c  2+1 --> break 
c    (-b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧  p_546) -> break
c  in CNF:
c     b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 19037 -19038  19039 -546 1162 0


c  2-1 --> 1
c    (-b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧ -p_546) -> (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0)
c  in CNF:
c     b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_2
c     b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_1
c     b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨  b^{91, 7}_0
c  in DIMACS:
 19037 -19038  19039  546 -19040 0
 19037 -19038  19039  546 -19041 0
 19037 -19038  19039  546  19042 0

c  1-1 --> 0
c    (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0 ∧ -p_546) -> (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧ -b^{91, 7}_0)
c  in CNF:
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_2
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_1
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_0
c  in DIMACS:
 19037  19038 -19039  546 -19040 0
 19037  19038 -19039  546 -19041 0
 19037  19038 -19039  546 -19042 0

c  0-1 --> -1
c    (-b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧ -p_546) -> ( b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0)
c  in CNF:
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨  b^{91, 7}_2
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_1
c     b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨  b^{91, 7}_0
c  in DIMACS:
 19037  19038  19039  546  19040 0
 19037  19038  19039  546 -19041 0
 19037  19038  19039  546  19042 0

c  -1-1 --> -2
c    ( b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧  b^{91, 6}_0 ∧ -p_546) -> ( b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0)
c  in CNF:
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨  b^{91, 7}_2
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨  b^{91, 7}_1
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨  p_546 ∨ -b^{91, 7}_0
c  in DIMACS:
-19037  19038 -19039  546  19040 0
-19037  19038 -19039  546  19041 0
-19037  19038 -19039  546 -19042 0

c  -2-1 --> break 
c    ( b^{91, 6}_2 ∧  b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨  b^{91, 6}_0 ∨  p_546 ∨ break
c  in DIMACS:
-19037 -19038  19039  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 6}_2 ∧ -b^{91, 6}_1 ∧ -b^{91, 6}_0 ∧ true) 
c  in CNF:
c    -b^{91, 6}_2 ∨  b^{91, 6}_1 ∨  b^{91, 6}_0 ∨ false 
c  in DIMACS:
-19037  19038  19039  0

c  3 does not represent an automaton state.
c    -(-b^{91, 6}_2 ∧  b^{91, 6}_1 ∧  b^{91, 6}_0 ∧ true) 
c  in CNF:
c     b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ false 
c  in DIMACS:
 19037 -19038 -19039  0
c  -3 does not represent an automaton state.
c    -( b^{91, 6}_2 ∧  b^{91, 6}_1 ∧  b^{91, 6}_0 ∧ true) 
c  in CNF:
c    -b^{91, 6}_2 ∨ -b^{91, 6}_1 ∨ -b^{91, 6}_0 ∨ false 
c  in DIMACS:
-19037 -19038 -19039  0

c i = 7
c  -2+1 --> -1
c    ( b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧  p_637) -> ( b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0)
c  in CNF:
c    -b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨  b^{91, 8}_2
c    -b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_1
c    -b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨  b^{91, 8}_0
c  in DIMACS:
-19040 -19041  19042 -637  19043 0
-19040 -19041  19042 -637 -19044 0
-19040 -19041  19042 -637  19045 0

c  -1+1 --> 0
c    ( b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0 ∧  p_637) -> (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧ -b^{91, 8}_0)
c  in CNF:
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_2
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_1
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_0
c  in DIMACS:
-19040  19041 -19042 -637 -19043 0
-19040  19041 -19042 -637 -19044 0
-19040  19041 -19042 -637 -19045 0

c  0+1 --> 1
c    (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧  p_637) -> (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0)
c  in CNF:
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_2
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_1
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨  b^{91, 8}_0
c  in DIMACS:
 19040  19041  19042 -637 -19043 0
 19040  19041  19042 -637 -19044 0
 19040  19041  19042 -637  19045 0

c  1+1 --> 2
c    (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0 ∧  p_637) -> (-b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0)
c  in CNF:
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_2
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨  b^{91, 8}_1
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ -p_637 ∨ -b^{91, 8}_0
c  in DIMACS:
 19040  19041 -19042 -637 -19043 0
 19040  19041 -19042 -637  19044 0
 19040  19041 -19042 -637 -19045 0

c  2+1 --> break 
c    (-b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧  p_637) -> break
c  in CNF:
c     b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ -p_637 ∨ break
c  in DIMACS:
 19040 -19041  19042 -637 1162 0


c  2-1 --> 1
c    (-b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧ -p_637) -> (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0)
c  in CNF:
c     b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_2
c     b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_1
c     b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨  b^{91, 8}_0
c  in DIMACS:
 19040 -19041  19042  637 -19043 0
 19040 -19041  19042  637 -19044 0
 19040 -19041  19042  637  19045 0

c  1-1 --> 0
c    (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0 ∧ -p_637) -> (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧ -b^{91, 8}_0)
c  in CNF:
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_2
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_1
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_0
c  in DIMACS:
 19040  19041 -19042  637 -19043 0
 19040  19041 -19042  637 -19044 0
 19040  19041 -19042  637 -19045 0

c  0-1 --> -1
c    (-b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧ -p_637) -> ( b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0)
c  in CNF:
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨  b^{91, 8}_2
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_1
c     b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨  b^{91, 8}_0
c  in DIMACS:
 19040  19041  19042  637  19043 0
 19040  19041  19042  637 -19044 0
 19040  19041  19042  637  19045 0

c  -1-1 --> -2
c    ( b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧  b^{91, 7}_0 ∧ -p_637) -> ( b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0)
c  in CNF:
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨  b^{91, 8}_2
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨  b^{91, 8}_1
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨  p_637 ∨ -b^{91, 8}_0
c  in DIMACS:
-19040  19041 -19042  637  19043 0
-19040  19041 -19042  637  19044 0
-19040  19041 -19042  637 -19045 0

c  -2-1 --> break 
c    ( b^{91, 7}_2 ∧  b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧ -p_637) -> break
c  in CNF:
c    -b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨  b^{91, 7}_0 ∨  p_637 ∨ break
c  in DIMACS:
-19040 -19041  19042  637 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 7}_2 ∧ -b^{91, 7}_1 ∧ -b^{91, 7}_0 ∧ true) 
c  in CNF:
c    -b^{91, 7}_2 ∨  b^{91, 7}_1 ∨  b^{91, 7}_0 ∨ false 
c  in DIMACS:
-19040  19041  19042  0

c  3 does not represent an automaton state.
c    -(-b^{91, 7}_2 ∧  b^{91, 7}_1 ∧  b^{91, 7}_0 ∧ true) 
c  in CNF:
c     b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ false 
c  in DIMACS:
 19040 -19041 -19042  0
c  -3 does not represent an automaton state.
c    -( b^{91, 7}_2 ∧  b^{91, 7}_1 ∧  b^{91, 7}_0 ∧ true) 
c  in CNF:
c    -b^{91, 7}_2 ∨ -b^{91, 7}_1 ∨ -b^{91, 7}_0 ∨ false 
c  in DIMACS:
-19040 -19041 -19042  0

c i = 8
c  -2+1 --> -1
c    ( b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧  p_728) -> ( b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0)
c  in CNF:
c    -b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨  b^{91, 9}_2
c    -b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_1
c    -b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨  b^{91, 9}_0
c  in DIMACS:
-19043 -19044  19045 -728  19046 0
-19043 -19044  19045 -728 -19047 0
-19043 -19044  19045 -728  19048 0

c  -1+1 --> 0
c    ( b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0 ∧  p_728) -> (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧ -b^{91, 9}_0)
c  in CNF:
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_2
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_1
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_0
c  in DIMACS:
-19043  19044 -19045 -728 -19046 0
-19043  19044 -19045 -728 -19047 0
-19043  19044 -19045 -728 -19048 0

c  0+1 --> 1
c    (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧  p_728) -> (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0)
c  in CNF:
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_2
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_1
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨  b^{91, 9}_0
c  in DIMACS:
 19043  19044  19045 -728 -19046 0
 19043  19044  19045 -728 -19047 0
 19043  19044  19045 -728  19048 0

c  1+1 --> 2
c    (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0 ∧  p_728) -> (-b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0)
c  in CNF:
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_2
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨  b^{91, 9}_1
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ -p_728 ∨ -b^{91, 9}_0
c  in DIMACS:
 19043  19044 -19045 -728 -19046 0
 19043  19044 -19045 -728  19047 0
 19043  19044 -19045 -728 -19048 0

c  2+1 --> break 
c    (-b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧  p_728) -> break
c  in CNF:
c     b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 19043 -19044  19045 -728 1162 0


c  2-1 --> 1
c    (-b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧ -p_728) -> (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0)
c  in CNF:
c     b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_2
c     b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_1
c     b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨  b^{91, 9}_0
c  in DIMACS:
 19043 -19044  19045  728 -19046 0
 19043 -19044  19045  728 -19047 0
 19043 -19044  19045  728  19048 0

c  1-1 --> 0
c    (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0 ∧ -p_728) -> (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧ -b^{91, 9}_0)
c  in CNF:
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_2
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_1
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_0
c  in DIMACS:
 19043  19044 -19045  728 -19046 0
 19043  19044 -19045  728 -19047 0
 19043  19044 -19045  728 -19048 0

c  0-1 --> -1
c    (-b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧ -p_728) -> ( b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0)
c  in CNF:
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨  b^{91, 9}_2
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_1
c     b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨  b^{91, 9}_0
c  in DIMACS:
 19043  19044  19045  728  19046 0
 19043  19044  19045  728 -19047 0
 19043  19044  19045  728  19048 0

c  -1-1 --> -2
c    ( b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧  b^{91, 8}_0 ∧ -p_728) -> ( b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0)
c  in CNF:
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨  b^{91, 9}_2
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨  b^{91, 9}_1
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨  p_728 ∨ -b^{91, 9}_0
c  in DIMACS:
-19043  19044 -19045  728  19046 0
-19043  19044 -19045  728  19047 0
-19043  19044 -19045  728 -19048 0

c  -2-1 --> break 
c    ( b^{91, 8}_2 ∧  b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨  b^{91, 8}_0 ∨  p_728 ∨ break
c  in DIMACS:
-19043 -19044  19045  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 8}_2 ∧ -b^{91, 8}_1 ∧ -b^{91, 8}_0 ∧ true) 
c  in CNF:
c    -b^{91, 8}_2 ∨  b^{91, 8}_1 ∨  b^{91, 8}_0 ∨ false 
c  in DIMACS:
-19043  19044  19045  0

c  3 does not represent an automaton state.
c    -(-b^{91, 8}_2 ∧  b^{91, 8}_1 ∧  b^{91, 8}_0 ∧ true) 
c  in CNF:
c     b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ false 
c  in DIMACS:
 19043 -19044 -19045  0
c  -3 does not represent an automaton state.
c    -( b^{91, 8}_2 ∧  b^{91, 8}_1 ∧  b^{91, 8}_0 ∧ true) 
c  in CNF:
c    -b^{91, 8}_2 ∨ -b^{91, 8}_1 ∨ -b^{91, 8}_0 ∨ false 
c  in DIMACS:
-19043 -19044 -19045  0

c i = 9
c  -2+1 --> -1
c    ( b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧  p_819) -> ( b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0)
c  in CNF:
c    -b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨  b^{91, 10}_2
c    -b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_1
c    -b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨  b^{91, 10}_0
c  in DIMACS:
-19046 -19047  19048 -819  19049 0
-19046 -19047  19048 -819 -19050 0
-19046 -19047  19048 -819  19051 0

c  -1+1 --> 0
c    ( b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0 ∧  p_819) -> (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧ -b^{91, 10}_0)
c  in CNF:
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_2
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_1
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_0
c  in DIMACS:
-19046  19047 -19048 -819 -19049 0
-19046  19047 -19048 -819 -19050 0
-19046  19047 -19048 -819 -19051 0

c  0+1 --> 1
c    (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧  p_819) -> (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0)
c  in CNF:
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_2
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_1
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨  b^{91, 10}_0
c  in DIMACS:
 19046  19047  19048 -819 -19049 0
 19046  19047  19048 -819 -19050 0
 19046  19047  19048 -819  19051 0

c  1+1 --> 2
c    (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0 ∧  p_819) -> (-b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0)
c  in CNF:
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_2
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨  b^{91, 10}_1
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ -p_819 ∨ -b^{91, 10}_0
c  in DIMACS:
 19046  19047 -19048 -819 -19049 0
 19046  19047 -19048 -819  19050 0
 19046  19047 -19048 -819 -19051 0

c  2+1 --> break 
c    (-b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧  p_819) -> break
c  in CNF:
c     b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 19046 -19047  19048 -819 1162 0


c  2-1 --> 1
c    (-b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧ -p_819) -> (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0)
c  in CNF:
c     b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_2
c     b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_1
c     b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨  b^{91, 10}_0
c  in DIMACS:
 19046 -19047  19048  819 -19049 0
 19046 -19047  19048  819 -19050 0
 19046 -19047  19048  819  19051 0

c  1-1 --> 0
c    (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0 ∧ -p_819) -> (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧ -b^{91, 10}_0)
c  in CNF:
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_2
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_1
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_0
c  in DIMACS:
 19046  19047 -19048  819 -19049 0
 19046  19047 -19048  819 -19050 0
 19046  19047 -19048  819 -19051 0

c  0-1 --> -1
c    (-b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧ -p_819) -> ( b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0)
c  in CNF:
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨  b^{91, 10}_2
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_1
c     b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨  b^{91, 10}_0
c  in DIMACS:
 19046  19047  19048  819  19049 0
 19046  19047  19048  819 -19050 0
 19046  19047  19048  819  19051 0

c  -1-1 --> -2
c    ( b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧  b^{91, 9}_0 ∧ -p_819) -> ( b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0)
c  in CNF:
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨  b^{91, 10}_2
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨  b^{91, 10}_1
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨  p_819 ∨ -b^{91, 10}_0
c  in DIMACS:
-19046  19047 -19048  819  19049 0
-19046  19047 -19048  819  19050 0
-19046  19047 -19048  819 -19051 0

c  -2-1 --> break 
c    ( b^{91, 9}_2 ∧  b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨  b^{91, 9}_0 ∨  p_819 ∨ break
c  in DIMACS:
-19046 -19047  19048  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 9}_2 ∧ -b^{91, 9}_1 ∧ -b^{91, 9}_0 ∧ true) 
c  in CNF:
c    -b^{91, 9}_2 ∨  b^{91, 9}_1 ∨  b^{91, 9}_0 ∨ false 
c  in DIMACS:
-19046  19047  19048  0

c  3 does not represent an automaton state.
c    -(-b^{91, 9}_2 ∧  b^{91, 9}_1 ∧  b^{91, 9}_0 ∧ true) 
c  in CNF:
c     b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ false 
c  in DIMACS:
 19046 -19047 -19048  0
c  -3 does not represent an automaton state.
c    -( b^{91, 9}_2 ∧  b^{91, 9}_1 ∧  b^{91, 9}_0 ∧ true) 
c  in CNF:
c    -b^{91, 9}_2 ∨ -b^{91, 9}_1 ∨ -b^{91, 9}_0 ∨ false 
c  in DIMACS:
-19046 -19047 -19048  0

c i = 10
c  -2+1 --> -1
c    ( b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧  p_910) -> ( b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0)
c  in CNF:
c    -b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨  b^{91, 11}_2
c    -b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_1
c    -b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨  b^{91, 11}_0
c  in DIMACS:
-19049 -19050  19051 -910  19052 0
-19049 -19050  19051 -910 -19053 0
-19049 -19050  19051 -910  19054 0

c  -1+1 --> 0
c    ( b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0 ∧  p_910) -> (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧ -b^{91, 11}_0)
c  in CNF:
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_2
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_1
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_0
c  in DIMACS:
-19049  19050 -19051 -910 -19052 0
-19049  19050 -19051 -910 -19053 0
-19049  19050 -19051 -910 -19054 0

c  0+1 --> 1
c    (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧  p_910) -> (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0)
c  in CNF:
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_2
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_1
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨  b^{91, 11}_0
c  in DIMACS:
 19049  19050  19051 -910 -19052 0
 19049  19050  19051 -910 -19053 0
 19049  19050  19051 -910  19054 0

c  1+1 --> 2
c    (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0 ∧  p_910) -> (-b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0)
c  in CNF:
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_2
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨  b^{91, 11}_1
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ -p_910 ∨ -b^{91, 11}_0
c  in DIMACS:
 19049  19050 -19051 -910 -19052 0
 19049  19050 -19051 -910  19053 0
 19049  19050 -19051 -910 -19054 0

c  2+1 --> break 
c    (-b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧  p_910) -> break
c  in CNF:
c     b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 19049 -19050  19051 -910 1162 0


c  2-1 --> 1
c    (-b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧ -p_910) -> (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0)
c  in CNF:
c     b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_2
c     b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_1
c     b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨  b^{91, 11}_0
c  in DIMACS:
 19049 -19050  19051  910 -19052 0
 19049 -19050  19051  910 -19053 0
 19049 -19050  19051  910  19054 0

c  1-1 --> 0
c    (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0 ∧ -p_910) -> (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧ -b^{91, 11}_0)
c  in CNF:
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_2
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_1
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_0
c  in DIMACS:
 19049  19050 -19051  910 -19052 0
 19049  19050 -19051  910 -19053 0
 19049  19050 -19051  910 -19054 0

c  0-1 --> -1
c    (-b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧ -p_910) -> ( b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0)
c  in CNF:
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨  b^{91, 11}_2
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_1
c     b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨  b^{91, 11}_0
c  in DIMACS:
 19049  19050  19051  910  19052 0
 19049  19050  19051  910 -19053 0
 19049  19050  19051  910  19054 0

c  -1-1 --> -2
c    ( b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧  b^{91, 10}_0 ∧ -p_910) -> ( b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0)
c  in CNF:
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨  b^{91, 11}_2
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨  b^{91, 11}_1
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨  p_910 ∨ -b^{91, 11}_0
c  in DIMACS:
-19049  19050 -19051  910  19052 0
-19049  19050 -19051  910  19053 0
-19049  19050 -19051  910 -19054 0

c  -2-1 --> break 
c    ( b^{91, 10}_2 ∧  b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨  b^{91, 10}_0 ∨  p_910 ∨ break
c  in DIMACS:
-19049 -19050  19051  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 10}_2 ∧ -b^{91, 10}_1 ∧ -b^{91, 10}_0 ∧ true) 
c  in CNF:
c    -b^{91, 10}_2 ∨  b^{91, 10}_1 ∨  b^{91, 10}_0 ∨ false 
c  in DIMACS:
-19049  19050  19051  0

c  3 does not represent an automaton state.
c    -(-b^{91, 10}_2 ∧  b^{91, 10}_1 ∧  b^{91, 10}_0 ∧ true) 
c  in CNF:
c     b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ false 
c  in DIMACS:
 19049 -19050 -19051  0
c  -3 does not represent an automaton state.
c    -( b^{91, 10}_2 ∧  b^{91, 10}_1 ∧  b^{91, 10}_0 ∧ true) 
c  in CNF:
c    -b^{91, 10}_2 ∨ -b^{91, 10}_1 ∨ -b^{91, 10}_0 ∨ false 
c  in DIMACS:
-19049 -19050 -19051  0

c i = 11
c  -2+1 --> -1
c    ( b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧  p_1001) -> ( b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0)
c  in CNF:
c    -b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨  b^{91, 12}_2
c    -b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_1
c    -b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨  b^{91, 12}_0
c  in DIMACS:
-19052 -19053  19054 -1001  19055 0
-19052 -19053  19054 -1001 -19056 0
-19052 -19053  19054 -1001  19057 0

c  -1+1 --> 0
c    ( b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0 ∧  p_1001) -> (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧ -b^{91, 12}_0)
c  in CNF:
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_2
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_1
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_0
c  in DIMACS:
-19052  19053 -19054 -1001 -19055 0
-19052  19053 -19054 -1001 -19056 0
-19052  19053 -19054 -1001 -19057 0

c  0+1 --> 1
c    (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧  p_1001) -> (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0)
c  in CNF:
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_2
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_1
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨  b^{91, 12}_0
c  in DIMACS:
 19052  19053  19054 -1001 -19055 0
 19052  19053  19054 -1001 -19056 0
 19052  19053  19054 -1001  19057 0

c  1+1 --> 2
c    (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0 ∧  p_1001) -> (-b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0)
c  in CNF:
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_2
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨  b^{91, 12}_1
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ -p_1001 ∨ -b^{91, 12}_0
c  in DIMACS:
 19052  19053 -19054 -1001 -19055 0
 19052  19053 -19054 -1001  19056 0
 19052  19053 -19054 -1001 -19057 0

c  2+1 --> break 
c    (-b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 19052 -19053  19054 -1001 1162 0


c  2-1 --> 1
c    (-b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧ -p_1001) -> (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0)
c  in CNF:
c     b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_2
c     b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_1
c     b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨  b^{91, 12}_0
c  in DIMACS:
 19052 -19053  19054  1001 -19055 0
 19052 -19053  19054  1001 -19056 0
 19052 -19053  19054  1001  19057 0

c  1-1 --> 0
c    (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0 ∧ -p_1001) -> (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧ -b^{91, 12}_0)
c  in CNF:
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_2
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_1
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_0
c  in DIMACS:
 19052  19053 -19054  1001 -19055 0
 19052  19053 -19054  1001 -19056 0
 19052  19053 -19054  1001 -19057 0

c  0-1 --> -1
c    (-b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧ -p_1001) -> ( b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0)
c  in CNF:
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨  b^{91, 12}_2
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_1
c     b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨  b^{91, 12}_0
c  in DIMACS:
 19052  19053  19054  1001  19055 0
 19052  19053  19054  1001 -19056 0
 19052  19053  19054  1001  19057 0

c  -1-1 --> -2
c    ( b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧  b^{91, 11}_0 ∧ -p_1001) -> ( b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0)
c  in CNF:
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨  b^{91, 12}_2
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨  b^{91, 12}_1
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨  p_1001 ∨ -b^{91, 12}_0
c  in DIMACS:
-19052  19053 -19054  1001  19055 0
-19052  19053 -19054  1001  19056 0
-19052  19053 -19054  1001 -19057 0

c  -2-1 --> break 
c    ( b^{91, 11}_2 ∧  b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨  b^{91, 11}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-19052 -19053  19054  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 11}_2 ∧ -b^{91, 11}_1 ∧ -b^{91, 11}_0 ∧ true) 
c  in CNF:
c    -b^{91, 11}_2 ∨  b^{91, 11}_1 ∨  b^{91, 11}_0 ∨ false 
c  in DIMACS:
-19052  19053  19054  0

c  3 does not represent an automaton state.
c    -(-b^{91, 11}_2 ∧  b^{91, 11}_1 ∧  b^{91, 11}_0 ∧ true) 
c  in CNF:
c     b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ false 
c  in DIMACS:
 19052 -19053 -19054  0
c  -3 does not represent an automaton state.
c    -( b^{91, 11}_2 ∧  b^{91, 11}_1 ∧  b^{91, 11}_0 ∧ true) 
c  in CNF:
c    -b^{91, 11}_2 ∨ -b^{91, 11}_1 ∨ -b^{91, 11}_0 ∨ false 
c  in DIMACS:
-19052 -19053 -19054  0

c i = 12
c  -2+1 --> -1
c    ( b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧  p_1092) -> ( b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧  b^{91, 13}_0)
c  in CNF:
c    -b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨  b^{91, 13}_2
c    -b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_1
c    -b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨  b^{91, 13}_0
c  in DIMACS:
-19055 -19056  19057 -1092  19058 0
-19055 -19056  19057 -1092 -19059 0
-19055 -19056  19057 -1092  19060 0

c  -1+1 --> 0
c    ( b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0 ∧  p_1092) -> (-b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧ -b^{91, 13}_0)
c  in CNF:
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_2
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_1
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_0
c  in DIMACS:
-19055  19056 -19057 -1092 -19058 0
-19055  19056 -19057 -1092 -19059 0
-19055  19056 -19057 -1092 -19060 0

c  0+1 --> 1
c    (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧  p_1092) -> (-b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧  b^{91, 13}_0)
c  in CNF:
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_2
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_1
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨  b^{91, 13}_0
c  in DIMACS:
 19055  19056  19057 -1092 -19058 0
 19055  19056  19057 -1092 -19059 0
 19055  19056  19057 -1092  19060 0

c  1+1 --> 2
c    (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0 ∧  p_1092) -> (-b^{91, 13}_2 ∧  b^{91, 13}_1 ∧ -b^{91, 13}_0)
c  in CNF:
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_2
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨  b^{91, 13}_1
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ -p_1092 ∨ -b^{91, 13}_0
c  in DIMACS:
 19055  19056 -19057 -1092 -19058 0
 19055  19056 -19057 -1092  19059 0
 19055  19056 -19057 -1092 -19060 0

c  2+1 --> break 
c    (-b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 19055 -19056  19057 -1092 1162 0


c  2-1 --> 1
c    (-b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧ -p_1092) -> (-b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧  b^{91, 13}_0)
c  in CNF:
c     b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_2
c     b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_1
c     b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨  b^{91, 13}_0
c  in DIMACS:
 19055 -19056  19057  1092 -19058 0
 19055 -19056  19057  1092 -19059 0
 19055 -19056  19057  1092  19060 0

c  1-1 --> 0
c    (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0 ∧ -p_1092) -> (-b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧ -b^{91, 13}_0)
c  in CNF:
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_2
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_1
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_0
c  in DIMACS:
 19055  19056 -19057  1092 -19058 0
 19055  19056 -19057  1092 -19059 0
 19055  19056 -19057  1092 -19060 0

c  0-1 --> -1
c    (-b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧ -p_1092) -> ( b^{91, 13}_2 ∧ -b^{91, 13}_1 ∧  b^{91, 13}_0)
c  in CNF:
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨  b^{91, 13}_2
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_1
c     b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨  b^{91, 13}_0
c  in DIMACS:
 19055  19056  19057  1092  19058 0
 19055  19056  19057  1092 -19059 0
 19055  19056  19057  1092  19060 0

c  -1-1 --> -2
c    ( b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧  b^{91, 12}_0 ∧ -p_1092) -> ( b^{91, 13}_2 ∧  b^{91, 13}_1 ∧ -b^{91, 13}_0)
c  in CNF:
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨  b^{91, 13}_2
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨  b^{91, 13}_1
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨  p_1092 ∨ -b^{91, 13}_0
c  in DIMACS:
-19055  19056 -19057  1092  19058 0
-19055  19056 -19057  1092  19059 0
-19055  19056 -19057  1092 -19060 0

c  -2-1 --> break 
c    ( b^{91, 12}_2 ∧  b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨  b^{91, 12}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-19055 -19056  19057  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{91, 12}_2 ∧ -b^{91, 12}_1 ∧ -b^{91, 12}_0 ∧ true) 
c  in CNF:
c    -b^{91, 12}_2 ∨  b^{91, 12}_1 ∨  b^{91, 12}_0 ∨ false 
c  in DIMACS:
-19055  19056  19057  0

c  3 does not represent an automaton state.
c    -(-b^{91, 12}_2 ∧  b^{91, 12}_1 ∧  b^{91, 12}_0 ∧ true) 
c  in CNF:
c     b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ false 
c  in DIMACS:
 19055 -19056 -19057  0
c  -3 does not represent an automaton state.
c    -( b^{91, 12}_2 ∧  b^{91, 12}_1 ∧  b^{91, 12}_0 ∧ true) 
c  in CNF:
c    -b^{91, 12}_2 ∨ -b^{91, 12}_1 ∨ -b^{91, 12}_0 ∨ false 
c  in DIMACS:
-19055 -19056 -19057  0

c INIT for k = 92
c    -b^{92, 1}_2
c    -b^{92, 1}_1
c    -b^{92, 1}_0
c  in DIMACS:
-19061 0
-19062 0
-19063 0

c Transitions for k = 92
c i = 1
c  -2+1 --> -1
c    ( b^{92, 1}_2 ∧  b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧  p_92) -> ( b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0)
c  in CNF:
c    -b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨  b^{92, 2}_2
c    -b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_1
c    -b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨  b^{92, 2}_0
c  in DIMACS:
-19061 -19062  19063 -92  19064 0
-19061 -19062  19063 -92 -19065 0
-19061 -19062  19063 -92  19066 0

c  -1+1 --> 0
c    ( b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧  b^{92, 1}_0 ∧  p_92) -> (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧ -b^{92, 2}_0)
c  in CNF:
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_2
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_1
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_0
c  in DIMACS:
-19061  19062 -19063 -92 -19064 0
-19061  19062 -19063 -92 -19065 0
-19061  19062 -19063 -92 -19066 0

c  0+1 --> 1
c    (-b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧  p_92) -> (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0)
c  in CNF:
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_2
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_1
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨  b^{92, 2}_0
c  in DIMACS:
 19061  19062  19063 -92 -19064 0
 19061  19062  19063 -92 -19065 0
 19061  19062  19063 -92  19066 0

c  1+1 --> 2
c    (-b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧  b^{92, 1}_0 ∧  p_92) -> (-b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0)
c  in CNF:
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_2
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨  b^{92, 2}_1
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ -p_92 ∨ -b^{92, 2}_0
c  in DIMACS:
 19061  19062 -19063 -92 -19064 0
 19061  19062 -19063 -92  19065 0
 19061  19062 -19063 -92 -19066 0

c  2+1 --> break 
c    (-b^{92, 1}_2 ∧  b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧  p_92) -> break
c  in CNF:
c     b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ -p_92 ∨ break
c  in DIMACS:
 19061 -19062  19063 -92 1162 0


c  2-1 --> 1
c    (-b^{92, 1}_2 ∧  b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧ -p_92) -> (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0)
c  in CNF:
c     b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_2
c     b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_1
c     b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨  b^{92, 2}_0
c  in DIMACS:
 19061 -19062  19063  92 -19064 0
 19061 -19062  19063  92 -19065 0
 19061 -19062  19063  92  19066 0

c  1-1 --> 0
c    (-b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧  b^{92, 1}_0 ∧ -p_92) -> (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧ -b^{92, 2}_0)
c  in CNF:
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_2
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_1
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_0
c  in DIMACS:
 19061  19062 -19063  92 -19064 0
 19061  19062 -19063  92 -19065 0
 19061  19062 -19063  92 -19066 0

c  0-1 --> -1
c    (-b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧ -p_92) -> ( b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0)
c  in CNF:
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨  b^{92, 2}_2
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_1
c     b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨  b^{92, 2}_0
c  in DIMACS:
 19061  19062  19063  92  19064 0
 19061  19062  19063  92 -19065 0
 19061  19062  19063  92  19066 0

c  -1-1 --> -2
c    ( b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧  b^{92, 1}_0 ∧ -p_92) -> ( b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0)
c  in CNF:
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨  b^{92, 2}_2
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨  b^{92, 2}_1
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨  p_92 ∨ -b^{92, 2}_0
c  in DIMACS:
-19061  19062 -19063  92  19064 0
-19061  19062 -19063  92  19065 0
-19061  19062 -19063  92 -19066 0

c  -2-1 --> break 
c    ( b^{92, 1}_2 ∧  b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧ -p_92) -> break
c  in CNF:
c    -b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨  b^{92, 1}_0 ∨  p_92 ∨ break
c  in DIMACS:
-19061 -19062  19063  92 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 1}_2 ∧ -b^{92, 1}_1 ∧ -b^{92, 1}_0 ∧ true) 
c  in CNF:
c    -b^{92, 1}_2 ∨  b^{92, 1}_1 ∨  b^{92, 1}_0 ∨ false 
c  in DIMACS:
-19061  19062  19063  0

c  3 does not represent an automaton state.
c    -(-b^{92, 1}_2 ∧  b^{92, 1}_1 ∧  b^{92, 1}_0 ∧ true) 
c  in CNF:
c     b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ false 
c  in DIMACS:
 19061 -19062 -19063  0
c  -3 does not represent an automaton state.
c    -( b^{92, 1}_2 ∧  b^{92, 1}_1 ∧  b^{92, 1}_0 ∧ true) 
c  in CNF:
c    -b^{92, 1}_2 ∨ -b^{92, 1}_1 ∨ -b^{92, 1}_0 ∨ false 
c  in DIMACS:
-19061 -19062 -19063  0

c i = 2
c  -2+1 --> -1
c    ( b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧  p_184) -> ( b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0)
c  in CNF:
c    -b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨  b^{92, 3}_2
c    -b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_1
c    -b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨  b^{92, 3}_0
c  in DIMACS:
-19064 -19065  19066 -184  19067 0
-19064 -19065  19066 -184 -19068 0
-19064 -19065  19066 -184  19069 0

c  -1+1 --> 0
c    ( b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0 ∧  p_184) -> (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧ -b^{92, 3}_0)
c  in CNF:
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_2
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_1
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_0
c  in DIMACS:
-19064  19065 -19066 -184 -19067 0
-19064  19065 -19066 -184 -19068 0
-19064  19065 -19066 -184 -19069 0

c  0+1 --> 1
c    (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧  p_184) -> (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0)
c  in CNF:
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_2
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_1
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨  b^{92, 3}_0
c  in DIMACS:
 19064  19065  19066 -184 -19067 0
 19064  19065  19066 -184 -19068 0
 19064  19065  19066 -184  19069 0

c  1+1 --> 2
c    (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0 ∧  p_184) -> (-b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0)
c  in CNF:
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_2
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨  b^{92, 3}_1
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ -p_184 ∨ -b^{92, 3}_0
c  in DIMACS:
 19064  19065 -19066 -184 -19067 0
 19064  19065 -19066 -184  19068 0
 19064  19065 -19066 -184 -19069 0

c  2+1 --> break 
c    (-b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧  p_184) -> break
c  in CNF:
c     b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 19064 -19065  19066 -184 1162 0


c  2-1 --> 1
c    (-b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧ -p_184) -> (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0)
c  in CNF:
c     b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_2
c     b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_1
c     b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨  b^{92, 3}_0
c  in DIMACS:
 19064 -19065  19066  184 -19067 0
 19064 -19065  19066  184 -19068 0
 19064 -19065  19066  184  19069 0

c  1-1 --> 0
c    (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0 ∧ -p_184) -> (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧ -b^{92, 3}_0)
c  in CNF:
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_2
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_1
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_0
c  in DIMACS:
 19064  19065 -19066  184 -19067 0
 19064  19065 -19066  184 -19068 0
 19064  19065 -19066  184 -19069 0

c  0-1 --> -1
c    (-b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧ -p_184) -> ( b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0)
c  in CNF:
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨  b^{92, 3}_2
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_1
c     b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨  b^{92, 3}_0
c  in DIMACS:
 19064  19065  19066  184  19067 0
 19064  19065  19066  184 -19068 0
 19064  19065  19066  184  19069 0

c  -1-1 --> -2
c    ( b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧  b^{92, 2}_0 ∧ -p_184) -> ( b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0)
c  in CNF:
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨  b^{92, 3}_2
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨  b^{92, 3}_1
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨  p_184 ∨ -b^{92, 3}_0
c  in DIMACS:
-19064  19065 -19066  184  19067 0
-19064  19065 -19066  184  19068 0
-19064  19065 -19066  184 -19069 0

c  -2-1 --> break 
c    ( b^{92, 2}_2 ∧  b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨  b^{92, 2}_0 ∨  p_184 ∨ break
c  in DIMACS:
-19064 -19065  19066  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 2}_2 ∧ -b^{92, 2}_1 ∧ -b^{92, 2}_0 ∧ true) 
c  in CNF:
c    -b^{92, 2}_2 ∨  b^{92, 2}_1 ∨  b^{92, 2}_0 ∨ false 
c  in DIMACS:
-19064  19065  19066  0

c  3 does not represent an automaton state.
c    -(-b^{92, 2}_2 ∧  b^{92, 2}_1 ∧  b^{92, 2}_0 ∧ true) 
c  in CNF:
c     b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ false 
c  in DIMACS:
 19064 -19065 -19066  0
c  -3 does not represent an automaton state.
c    -( b^{92, 2}_2 ∧  b^{92, 2}_1 ∧  b^{92, 2}_0 ∧ true) 
c  in CNF:
c    -b^{92, 2}_2 ∨ -b^{92, 2}_1 ∨ -b^{92, 2}_0 ∨ false 
c  in DIMACS:
-19064 -19065 -19066  0

c i = 3
c  -2+1 --> -1
c    ( b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧  p_276) -> ( b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0)
c  in CNF:
c    -b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨  b^{92, 4}_2
c    -b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_1
c    -b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨  b^{92, 4}_0
c  in DIMACS:
-19067 -19068  19069 -276  19070 0
-19067 -19068  19069 -276 -19071 0
-19067 -19068  19069 -276  19072 0

c  -1+1 --> 0
c    ( b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0 ∧  p_276) -> (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧ -b^{92, 4}_0)
c  in CNF:
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_2
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_1
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_0
c  in DIMACS:
-19067  19068 -19069 -276 -19070 0
-19067  19068 -19069 -276 -19071 0
-19067  19068 -19069 -276 -19072 0

c  0+1 --> 1
c    (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧  p_276) -> (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0)
c  in CNF:
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_2
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_1
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨  b^{92, 4}_0
c  in DIMACS:
 19067  19068  19069 -276 -19070 0
 19067  19068  19069 -276 -19071 0
 19067  19068  19069 -276  19072 0

c  1+1 --> 2
c    (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0 ∧  p_276) -> (-b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0)
c  in CNF:
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_2
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨  b^{92, 4}_1
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ -p_276 ∨ -b^{92, 4}_0
c  in DIMACS:
 19067  19068 -19069 -276 -19070 0
 19067  19068 -19069 -276  19071 0
 19067  19068 -19069 -276 -19072 0

c  2+1 --> break 
c    (-b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧  p_276) -> break
c  in CNF:
c     b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 19067 -19068  19069 -276 1162 0


c  2-1 --> 1
c    (-b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧ -p_276) -> (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0)
c  in CNF:
c     b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_2
c     b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_1
c     b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨  b^{92, 4}_0
c  in DIMACS:
 19067 -19068  19069  276 -19070 0
 19067 -19068  19069  276 -19071 0
 19067 -19068  19069  276  19072 0

c  1-1 --> 0
c    (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0 ∧ -p_276) -> (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧ -b^{92, 4}_0)
c  in CNF:
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_2
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_1
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_0
c  in DIMACS:
 19067  19068 -19069  276 -19070 0
 19067  19068 -19069  276 -19071 0
 19067  19068 -19069  276 -19072 0

c  0-1 --> -1
c    (-b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧ -p_276) -> ( b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0)
c  in CNF:
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨  b^{92, 4}_2
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_1
c     b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨  b^{92, 4}_0
c  in DIMACS:
 19067  19068  19069  276  19070 0
 19067  19068  19069  276 -19071 0
 19067  19068  19069  276  19072 0

c  -1-1 --> -2
c    ( b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧  b^{92, 3}_0 ∧ -p_276) -> ( b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0)
c  in CNF:
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨  b^{92, 4}_2
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨  b^{92, 4}_1
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨  p_276 ∨ -b^{92, 4}_0
c  in DIMACS:
-19067  19068 -19069  276  19070 0
-19067  19068 -19069  276  19071 0
-19067  19068 -19069  276 -19072 0

c  -2-1 --> break 
c    ( b^{92, 3}_2 ∧  b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨  b^{92, 3}_0 ∨  p_276 ∨ break
c  in DIMACS:
-19067 -19068  19069  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 3}_2 ∧ -b^{92, 3}_1 ∧ -b^{92, 3}_0 ∧ true) 
c  in CNF:
c    -b^{92, 3}_2 ∨  b^{92, 3}_1 ∨  b^{92, 3}_0 ∨ false 
c  in DIMACS:
-19067  19068  19069  0

c  3 does not represent an automaton state.
c    -(-b^{92, 3}_2 ∧  b^{92, 3}_1 ∧  b^{92, 3}_0 ∧ true) 
c  in CNF:
c     b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ false 
c  in DIMACS:
 19067 -19068 -19069  0
c  -3 does not represent an automaton state.
c    -( b^{92, 3}_2 ∧  b^{92, 3}_1 ∧  b^{92, 3}_0 ∧ true) 
c  in CNF:
c    -b^{92, 3}_2 ∨ -b^{92, 3}_1 ∨ -b^{92, 3}_0 ∨ false 
c  in DIMACS:
-19067 -19068 -19069  0

c i = 4
c  -2+1 --> -1
c    ( b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧  p_368) -> ( b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0)
c  in CNF:
c    -b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨  b^{92, 5}_2
c    -b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_1
c    -b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨  b^{92, 5}_0
c  in DIMACS:
-19070 -19071  19072 -368  19073 0
-19070 -19071  19072 -368 -19074 0
-19070 -19071  19072 -368  19075 0

c  -1+1 --> 0
c    ( b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0 ∧  p_368) -> (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧ -b^{92, 5}_0)
c  in CNF:
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_2
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_1
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_0
c  in DIMACS:
-19070  19071 -19072 -368 -19073 0
-19070  19071 -19072 -368 -19074 0
-19070  19071 -19072 -368 -19075 0

c  0+1 --> 1
c    (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧  p_368) -> (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0)
c  in CNF:
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_2
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_1
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨  b^{92, 5}_0
c  in DIMACS:
 19070  19071  19072 -368 -19073 0
 19070  19071  19072 -368 -19074 0
 19070  19071  19072 -368  19075 0

c  1+1 --> 2
c    (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0 ∧  p_368) -> (-b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0)
c  in CNF:
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_2
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨  b^{92, 5}_1
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ -p_368 ∨ -b^{92, 5}_0
c  in DIMACS:
 19070  19071 -19072 -368 -19073 0
 19070  19071 -19072 -368  19074 0
 19070  19071 -19072 -368 -19075 0

c  2+1 --> break 
c    (-b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧  p_368) -> break
c  in CNF:
c     b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 19070 -19071  19072 -368 1162 0


c  2-1 --> 1
c    (-b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧ -p_368) -> (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0)
c  in CNF:
c     b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_2
c     b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_1
c     b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨  b^{92, 5}_0
c  in DIMACS:
 19070 -19071  19072  368 -19073 0
 19070 -19071  19072  368 -19074 0
 19070 -19071  19072  368  19075 0

c  1-1 --> 0
c    (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0 ∧ -p_368) -> (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧ -b^{92, 5}_0)
c  in CNF:
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_2
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_1
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_0
c  in DIMACS:
 19070  19071 -19072  368 -19073 0
 19070  19071 -19072  368 -19074 0
 19070  19071 -19072  368 -19075 0

c  0-1 --> -1
c    (-b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧ -p_368) -> ( b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0)
c  in CNF:
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨  b^{92, 5}_2
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_1
c     b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨  b^{92, 5}_0
c  in DIMACS:
 19070  19071  19072  368  19073 0
 19070  19071  19072  368 -19074 0
 19070  19071  19072  368  19075 0

c  -1-1 --> -2
c    ( b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧  b^{92, 4}_0 ∧ -p_368) -> ( b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0)
c  in CNF:
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨  b^{92, 5}_2
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨  b^{92, 5}_1
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨  p_368 ∨ -b^{92, 5}_0
c  in DIMACS:
-19070  19071 -19072  368  19073 0
-19070  19071 -19072  368  19074 0
-19070  19071 -19072  368 -19075 0

c  -2-1 --> break 
c    ( b^{92, 4}_2 ∧  b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨  b^{92, 4}_0 ∨  p_368 ∨ break
c  in DIMACS:
-19070 -19071  19072  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 4}_2 ∧ -b^{92, 4}_1 ∧ -b^{92, 4}_0 ∧ true) 
c  in CNF:
c    -b^{92, 4}_2 ∨  b^{92, 4}_1 ∨  b^{92, 4}_0 ∨ false 
c  in DIMACS:
-19070  19071  19072  0

c  3 does not represent an automaton state.
c    -(-b^{92, 4}_2 ∧  b^{92, 4}_1 ∧  b^{92, 4}_0 ∧ true) 
c  in CNF:
c     b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ false 
c  in DIMACS:
 19070 -19071 -19072  0
c  -3 does not represent an automaton state.
c    -( b^{92, 4}_2 ∧  b^{92, 4}_1 ∧  b^{92, 4}_0 ∧ true) 
c  in CNF:
c    -b^{92, 4}_2 ∨ -b^{92, 4}_1 ∨ -b^{92, 4}_0 ∨ false 
c  in DIMACS:
-19070 -19071 -19072  0

c i = 5
c  -2+1 --> -1
c    ( b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧  p_460) -> ( b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0)
c  in CNF:
c    -b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨  b^{92, 6}_2
c    -b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_1
c    -b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨  b^{92, 6}_0
c  in DIMACS:
-19073 -19074  19075 -460  19076 0
-19073 -19074  19075 -460 -19077 0
-19073 -19074  19075 -460  19078 0

c  -1+1 --> 0
c    ( b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0 ∧  p_460) -> (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧ -b^{92, 6}_0)
c  in CNF:
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_2
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_1
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_0
c  in DIMACS:
-19073  19074 -19075 -460 -19076 0
-19073  19074 -19075 -460 -19077 0
-19073  19074 -19075 -460 -19078 0

c  0+1 --> 1
c    (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧  p_460) -> (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0)
c  in CNF:
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_2
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_1
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨  b^{92, 6}_0
c  in DIMACS:
 19073  19074  19075 -460 -19076 0
 19073  19074  19075 -460 -19077 0
 19073  19074  19075 -460  19078 0

c  1+1 --> 2
c    (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0 ∧  p_460) -> (-b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0)
c  in CNF:
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_2
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨  b^{92, 6}_1
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ -p_460 ∨ -b^{92, 6}_0
c  in DIMACS:
 19073  19074 -19075 -460 -19076 0
 19073  19074 -19075 -460  19077 0
 19073  19074 -19075 -460 -19078 0

c  2+1 --> break 
c    (-b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧  p_460) -> break
c  in CNF:
c     b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 19073 -19074  19075 -460 1162 0


c  2-1 --> 1
c    (-b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧ -p_460) -> (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0)
c  in CNF:
c     b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_2
c     b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_1
c     b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨  b^{92, 6}_0
c  in DIMACS:
 19073 -19074  19075  460 -19076 0
 19073 -19074  19075  460 -19077 0
 19073 -19074  19075  460  19078 0

c  1-1 --> 0
c    (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0 ∧ -p_460) -> (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧ -b^{92, 6}_0)
c  in CNF:
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_2
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_1
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_0
c  in DIMACS:
 19073  19074 -19075  460 -19076 0
 19073  19074 -19075  460 -19077 0
 19073  19074 -19075  460 -19078 0

c  0-1 --> -1
c    (-b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧ -p_460) -> ( b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0)
c  in CNF:
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨  b^{92, 6}_2
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_1
c     b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨  b^{92, 6}_0
c  in DIMACS:
 19073  19074  19075  460  19076 0
 19073  19074  19075  460 -19077 0
 19073  19074  19075  460  19078 0

c  -1-1 --> -2
c    ( b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧  b^{92, 5}_0 ∧ -p_460) -> ( b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0)
c  in CNF:
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨  b^{92, 6}_2
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨  b^{92, 6}_1
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨  p_460 ∨ -b^{92, 6}_0
c  in DIMACS:
-19073  19074 -19075  460  19076 0
-19073  19074 -19075  460  19077 0
-19073  19074 -19075  460 -19078 0

c  -2-1 --> break 
c    ( b^{92, 5}_2 ∧  b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨  b^{92, 5}_0 ∨  p_460 ∨ break
c  in DIMACS:
-19073 -19074  19075  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 5}_2 ∧ -b^{92, 5}_1 ∧ -b^{92, 5}_0 ∧ true) 
c  in CNF:
c    -b^{92, 5}_2 ∨  b^{92, 5}_1 ∨  b^{92, 5}_0 ∨ false 
c  in DIMACS:
-19073  19074  19075  0

c  3 does not represent an automaton state.
c    -(-b^{92, 5}_2 ∧  b^{92, 5}_1 ∧  b^{92, 5}_0 ∧ true) 
c  in CNF:
c     b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ false 
c  in DIMACS:
 19073 -19074 -19075  0
c  -3 does not represent an automaton state.
c    -( b^{92, 5}_2 ∧  b^{92, 5}_1 ∧  b^{92, 5}_0 ∧ true) 
c  in CNF:
c    -b^{92, 5}_2 ∨ -b^{92, 5}_1 ∨ -b^{92, 5}_0 ∨ false 
c  in DIMACS:
-19073 -19074 -19075  0

c i = 6
c  -2+1 --> -1
c    ( b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧  p_552) -> ( b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0)
c  in CNF:
c    -b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨  b^{92, 7}_2
c    -b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_1
c    -b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨  b^{92, 7}_0
c  in DIMACS:
-19076 -19077  19078 -552  19079 0
-19076 -19077  19078 -552 -19080 0
-19076 -19077  19078 -552  19081 0

c  -1+1 --> 0
c    ( b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0 ∧  p_552) -> (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧ -b^{92, 7}_0)
c  in CNF:
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_2
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_1
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_0
c  in DIMACS:
-19076  19077 -19078 -552 -19079 0
-19076  19077 -19078 -552 -19080 0
-19076  19077 -19078 -552 -19081 0

c  0+1 --> 1
c    (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧  p_552) -> (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0)
c  in CNF:
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_2
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_1
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨  b^{92, 7}_0
c  in DIMACS:
 19076  19077  19078 -552 -19079 0
 19076  19077  19078 -552 -19080 0
 19076  19077  19078 -552  19081 0

c  1+1 --> 2
c    (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0 ∧  p_552) -> (-b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0)
c  in CNF:
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_2
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨  b^{92, 7}_1
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ -p_552 ∨ -b^{92, 7}_0
c  in DIMACS:
 19076  19077 -19078 -552 -19079 0
 19076  19077 -19078 -552  19080 0
 19076  19077 -19078 -552 -19081 0

c  2+1 --> break 
c    (-b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧  p_552) -> break
c  in CNF:
c     b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 19076 -19077  19078 -552 1162 0


c  2-1 --> 1
c    (-b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧ -p_552) -> (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0)
c  in CNF:
c     b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_2
c     b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_1
c     b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨  b^{92, 7}_0
c  in DIMACS:
 19076 -19077  19078  552 -19079 0
 19076 -19077  19078  552 -19080 0
 19076 -19077  19078  552  19081 0

c  1-1 --> 0
c    (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0 ∧ -p_552) -> (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧ -b^{92, 7}_0)
c  in CNF:
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_2
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_1
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_0
c  in DIMACS:
 19076  19077 -19078  552 -19079 0
 19076  19077 -19078  552 -19080 0
 19076  19077 -19078  552 -19081 0

c  0-1 --> -1
c    (-b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧ -p_552) -> ( b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0)
c  in CNF:
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨  b^{92, 7}_2
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_1
c     b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨  b^{92, 7}_0
c  in DIMACS:
 19076  19077  19078  552  19079 0
 19076  19077  19078  552 -19080 0
 19076  19077  19078  552  19081 0

c  -1-1 --> -2
c    ( b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧  b^{92, 6}_0 ∧ -p_552) -> ( b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0)
c  in CNF:
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨  b^{92, 7}_2
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨  b^{92, 7}_1
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨  p_552 ∨ -b^{92, 7}_0
c  in DIMACS:
-19076  19077 -19078  552  19079 0
-19076  19077 -19078  552  19080 0
-19076  19077 -19078  552 -19081 0

c  -2-1 --> break 
c    ( b^{92, 6}_2 ∧  b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨  b^{92, 6}_0 ∨  p_552 ∨ break
c  in DIMACS:
-19076 -19077  19078  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 6}_2 ∧ -b^{92, 6}_1 ∧ -b^{92, 6}_0 ∧ true) 
c  in CNF:
c    -b^{92, 6}_2 ∨  b^{92, 6}_1 ∨  b^{92, 6}_0 ∨ false 
c  in DIMACS:
-19076  19077  19078  0

c  3 does not represent an automaton state.
c    -(-b^{92, 6}_2 ∧  b^{92, 6}_1 ∧  b^{92, 6}_0 ∧ true) 
c  in CNF:
c     b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ false 
c  in DIMACS:
 19076 -19077 -19078  0
c  -3 does not represent an automaton state.
c    -( b^{92, 6}_2 ∧  b^{92, 6}_1 ∧  b^{92, 6}_0 ∧ true) 
c  in CNF:
c    -b^{92, 6}_2 ∨ -b^{92, 6}_1 ∨ -b^{92, 6}_0 ∨ false 
c  in DIMACS:
-19076 -19077 -19078  0

c i = 7
c  -2+1 --> -1
c    ( b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧  p_644) -> ( b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0)
c  in CNF:
c    -b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨  b^{92, 8}_2
c    -b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_1
c    -b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨  b^{92, 8}_0
c  in DIMACS:
-19079 -19080  19081 -644  19082 0
-19079 -19080  19081 -644 -19083 0
-19079 -19080  19081 -644  19084 0

c  -1+1 --> 0
c    ( b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0 ∧  p_644) -> (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧ -b^{92, 8}_0)
c  in CNF:
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_2
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_1
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_0
c  in DIMACS:
-19079  19080 -19081 -644 -19082 0
-19079  19080 -19081 -644 -19083 0
-19079  19080 -19081 -644 -19084 0

c  0+1 --> 1
c    (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧  p_644) -> (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0)
c  in CNF:
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_2
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_1
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨  b^{92, 8}_0
c  in DIMACS:
 19079  19080  19081 -644 -19082 0
 19079  19080  19081 -644 -19083 0
 19079  19080  19081 -644  19084 0

c  1+1 --> 2
c    (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0 ∧  p_644) -> (-b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0)
c  in CNF:
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_2
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨  b^{92, 8}_1
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ -p_644 ∨ -b^{92, 8}_0
c  in DIMACS:
 19079  19080 -19081 -644 -19082 0
 19079  19080 -19081 -644  19083 0
 19079  19080 -19081 -644 -19084 0

c  2+1 --> break 
c    (-b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧  p_644) -> break
c  in CNF:
c     b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 19079 -19080  19081 -644 1162 0


c  2-1 --> 1
c    (-b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧ -p_644) -> (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0)
c  in CNF:
c     b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_2
c     b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_1
c     b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨  b^{92, 8}_0
c  in DIMACS:
 19079 -19080  19081  644 -19082 0
 19079 -19080  19081  644 -19083 0
 19079 -19080  19081  644  19084 0

c  1-1 --> 0
c    (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0 ∧ -p_644) -> (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧ -b^{92, 8}_0)
c  in CNF:
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_2
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_1
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_0
c  in DIMACS:
 19079  19080 -19081  644 -19082 0
 19079  19080 -19081  644 -19083 0
 19079  19080 -19081  644 -19084 0

c  0-1 --> -1
c    (-b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧ -p_644) -> ( b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0)
c  in CNF:
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨  b^{92, 8}_2
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_1
c     b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨  b^{92, 8}_0
c  in DIMACS:
 19079  19080  19081  644  19082 0
 19079  19080  19081  644 -19083 0
 19079  19080  19081  644  19084 0

c  -1-1 --> -2
c    ( b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧  b^{92, 7}_0 ∧ -p_644) -> ( b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0)
c  in CNF:
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨  b^{92, 8}_2
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨  b^{92, 8}_1
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨  p_644 ∨ -b^{92, 8}_0
c  in DIMACS:
-19079  19080 -19081  644  19082 0
-19079  19080 -19081  644  19083 0
-19079  19080 -19081  644 -19084 0

c  -2-1 --> break 
c    ( b^{92, 7}_2 ∧  b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨  b^{92, 7}_0 ∨  p_644 ∨ break
c  in DIMACS:
-19079 -19080  19081  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 7}_2 ∧ -b^{92, 7}_1 ∧ -b^{92, 7}_0 ∧ true) 
c  in CNF:
c    -b^{92, 7}_2 ∨  b^{92, 7}_1 ∨  b^{92, 7}_0 ∨ false 
c  in DIMACS:
-19079  19080  19081  0

c  3 does not represent an automaton state.
c    -(-b^{92, 7}_2 ∧  b^{92, 7}_1 ∧  b^{92, 7}_0 ∧ true) 
c  in CNF:
c     b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ false 
c  in DIMACS:
 19079 -19080 -19081  0
c  -3 does not represent an automaton state.
c    -( b^{92, 7}_2 ∧  b^{92, 7}_1 ∧  b^{92, 7}_0 ∧ true) 
c  in CNF:
c    -b^{92, 7}_2 ∨ -b^{92, 7}_1 ∨ -b^{92, 7}_0 ∨ false 
c  in DIMACS:
-19079 -19080 -19081  0

c i = 8
c  -2+1 --> -1
c    ( b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧  p_736) -> ( b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0)
c  in CNF:
c    -b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨  b^{92, 9}_2
c    -b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_1
c    -b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨  b^{92, 9}_0
c  in DIMACS:
-19082 -19083  19084 -736  19085 0
-19082 -19083  19084 -736 -19086 0
-19082 -19083  19084 -736  19087 0

c  -1+1 --> 0
c    ( b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0 ∧  p_736) -> (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧ -b^{92, 9}_0)
c  in CNF:
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_2
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_1
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_0
c  in DIMACS:
-19082  19083 -19084 -736 -19085 0
-19082  19083 -19084 -736 -19086 0
-19082  19083 -19084 -736 -19087 0

c  0+1 --> 1
c    (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧  p_736) -> (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0)
c  in CNF:
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_2
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_1
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨  b^{92, 9}_0
c  in DIMACS:
 19082  19083  19084 -736 -19085 0
 19082  19083  19084 -736 -19086 0
 19082  19083  19084 -736  19087 0

c  1+1 --> 2
c    (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0 ∧  p_736) -> (-b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0)
c  in CNF:
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_2
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨  b^{92, 9}_1
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ -p_736 ∨ -b^{92, 9}_0
c  in DIMACS:
 19082  19083 -19084 -736 -19085 0
 19082  19083 -19084 -736  19086 0
 19082  19083 -19084 -736 -19087 0

c  2+1 --> break 
c    (-b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧  p_736) -> break
c  in CNF:
c     b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 19082 -19083  19084 -736 1162 0


c  2-1 --> 1
c    (-b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧ -p_736) -> (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0)
c  in CNF:
c     b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_2
c     b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_1
c     b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨  b^{92, 9}_0
c  in DIMACS:
 19082 -19083  19084  736 -19085 0
 19082 -19083  19084  736 -19086 0
 19082 -19083  19084  736  19087 0

c  1-1 --> 0
c    (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0 ∧ -p_736) -> (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧ -b^{92, 9}_0)
c  in CNF:
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_2
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_1
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_0
c  in DIMACS:
 19082  19083 -19084  736 -19085 0
 19082  19083 -19084  736 -19086 0
 19082  19083 -19084  736 -19087 0

c  0-1 --> -1
c    (-b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧ -p_736) -> ( b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0)
c  in CNF:
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨  b^{92, 9}_2
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_1
c     b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨  b^{92, 9}_0
c  in DIMACS:
 19082  19083  19084  736  19085 0
 19082  19083  19084  736 -19086 0
 19082  19083  19084  736  19087 0

c  -1-1 --> -2
c    ( b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧  b^{92, 8}_0 ∧ -p_736) -> ( b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0)
c  in CNF:
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨  b^{92, 9}_2
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨  b^{92, 9}_1
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨  p_736 ∨ -b^{92, 9}_0
c  in DIMACS:
-19082  19083 -19084  736  19085 0
-19082  19083 -19084  736  19086 0
-19082  19083 -19084  736 -19087 0

c  -2-1 --> break 
c    ( b^{92, 8}_2 ∧  b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨  b^{92, 8}_0 ∨  p_736 ∨ break
c  in DIMACS:
-19082 -19083  19084  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 8}_2 ∧ -b^{92, 8}_1 ∧ -b^{92, 8}_0 ∧ true) 
c  in CNF:
c    -b^{92, 8}_2 ∨  b^{92, 8}_1 ∨  b^{92, 8}_0 ∨ false 
c  in DIMACS:
-19082  19083  19084  0

c  3 does not represent an automaton state.
c    -(-b^{92, 8}_2 ∧  b^{92, 8}_1 ∧  b^{92, 8}_0 ∧ true) 
c  in CNF:
c     b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ false 
c  in DIMACS:
 19082 -19083 -19084  0
c  -3 does not represent an automaton state.
c    -( b^{92, 8}_2 ∧  b^{92, 8}_1 ∧  b^{92, 8}_0 ∧ true) 
c  in CNF:
c    -b^{92, 8}_2 ∨ -b^{92, 8}_1 ∨ -b^{92, 8}_0 ∨ false 
c  in DIMACS:
-19082 -19083 -19084  0

c i = 9
c  -2+1 --> -1
c    ( b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧  p_828) -> ( b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0)
c  in CNF:
c    -b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨  b^{92, 10}_2
c    -b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_1
c    -b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨  b^{92, 10}_0
c  in DIMACS:
-19085 -19086  19087 -828  19088 0
-19085 -19086  19087 -828 -19089 0
-19085 -19086  19087 -828  19090 0

c  -1+1 --> 0
c    ( b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0 ∧  p_828) -> (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧ -b^{92, 10}_0)
c  in CNF:
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_2
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_1
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_0
c  in DIMACS:
-19085  19086 -19087 -828 -19088 0
-19085  19086 -19087 -828 -19089 0
-19085  19086 -19087 -828 -19090 0

c  0+1 --> 1
c    (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧  p_828) -> (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0)
c  in CNF:
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_2
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_1
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨  b^{92, 10}_0
c  in DIMACS:
 19085  19086  19087 -828 -19088 0
 19085  19086  19087 -828 -19089 0
 19085  19086  19087 -828  19090 0

c  1+1 --> 2
c    (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0 ∧  p_828) -> (-b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0)
c  in CNF:
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_2
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨  b^{92, 10}_1
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ -p_828 ∨ -b^{92, 10}_0
c  in DIMACS:
 19085  19086 -19087 -828 -19088 0
 19085  19086 -19087 -828  19089 0
 19085  19086 -19087 -828 -19090 0

c  2+1 --> break 
c    (-b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧  p_828) -> break
c  in CNF:
c     b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 19085 -19086  19087 -828 1162 0


c  2-1 --> 1
c    (-b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧ -p_828) -> (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0)
c  in CNF:
c     b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_2
c     b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_1
c     b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨  b^{92, 10}_0
c  in DIMACS:
 19085 -19086  19087  828 -19088 0
 19085 -19086  19087  828 -19089 0
 19085 -19086  19087  828  19090 0

c  1-1 --> 0
c    (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0 ∧ -p_828) -> (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧ -b^{92, 10}_0)
c  in CNF:
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_2
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_1
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_0
c  in DIMACS:
 19085  19086 -19087  828 -19088 0
 19085  19086 -19087  828 -19089 0
 19085  19086 -19087  828 -19090 0

c  0-1 --> -1
c    (-b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧ -p_828) -> ( b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0)
c  in CNF:
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨  b^{92, 10}_2
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_1
c     b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨  b^{92, 10}_0
c  in DIMACS:
 19085  19086  19087  828  19088 0
 19085  19086  19087  828 -19089 0
 19085  19086  19087  828  19090 0

c  -1-1 --> -2
c    ( b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧  b^{92, 9}_0 ∧ -p_828) -> ( b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0)
c  in CNF:
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨  b^{92, 10}_2
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨  b^{92, 10}_1
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨  p_828 ∨ -b^{92, 10}_0
c  in DIMACS:
-19085  19086 -19087  828  19088 0
-19085  19086 -19087  828  19089 0
-19085  19086 -19087  828 -19090 0

c  -2-1 --> break 
c    ( b^{92, 9}_2 ∧  b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨  b^{92, 9}_0 ∨  p_828 ∨ break
c  in DIMACS:
-19085 -19086  19087  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 9}_2 ∧ -b^{92, 9}_1 ∧ -b^{92, 9}_0 ∧ true) 
c  in CNF:
c    -b^{92, 9}_2 ∨  b^{92, 9}_1 ∨  b^{92, 9}_0 ∨ false 
c  in DIMACS:
-19085  19086  19087  0

c  3 does not represent an automaton state.
c    -(-b^{92, 9}_2 ∧  b^{92, 9}_1 ∧  b^{92, 9}_0 ∧ true) 
c  in CNF:
c     b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ false 
c  in DIMACS:
 19085 -19086 -19087  0
c  -3 does not represent an automaton state.
c    -( b^{92, 9}_2 ∧  b^{92, 9}_1 ∧  b^{92, 9}_0 ∧ true) 
c  in CNF:
c    -b^{92, 9}_2 ∨ -b^{92, 9}_1 ∨ -b^{92, 9}_0 ∨ false 
c  in DIMACS:
-19085 -19086 -19087  0

c i = 10
c  -2+1 --> -1
c    ( b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧  p_920) -> ( b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0)
c  in CNF:
c    -b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨  b^{92, 11}_2
c    -b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_1
c    -b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨  b^{92, 11}_0
c  in DIMACS:
-19088 -19089  19090 -920  19091 0
-19088 -19089  19090 -920 -19092 0
-19088 -19089  19090 -920  19093 0

c  -1+1 --> 0
c    ( b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0 ∧  p_920) -> (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧ -b^{92, 11}_0)
c  in CNF:
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_2
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_1
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_0
c  in DIMACS:
-19088  19089 -19090 -920 -19091 0
-19088  19089 -19090 -920 -19092 0
-19088  19089 -19090 -920 -19093 0

c  0+1 --> 1
c    (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧  p_920) -> (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0)
c  in CNF:
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_2
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_1
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨  b^{92, 11}_0
c  in DIMACS:
 19088  19089  19090 -920 -19091 0
 19088  19089  19090 -920 -19092 0
 19088  19089  19090 -920  19093 0

c  1+1 --> 2
c    (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0 ∧  p_920) -> (-b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0)
c  in CNF:
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_2
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨  b^{92, 11}_1
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ -p_920 ∨ -b^{92, 11}_0
c  in DIMACS:
 19088  19089 -19090 -920 -19091 0
 19088  19089 -19090 -920  19092 0
 19088  19089 -19090 -920 -19093 0

c  2+1 --> break 
c    (-b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧  p_920) -> break
c  in CNF:
c     b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 19088 -19089  19090 -920 1162 0


c  2-1 --> 1
c    (-b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧ -p_920) -> (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0)
c  in CNF:
c     b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_2
c     b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_1
c     b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨  b^{92, 11}_0
c  in DIMACS:
 19088 -19089  19090  920 -19091 0
 19088 -19089  19090  920 -19092 0
 19088 -19089  19090  920  19093 0

c  1-1 --> 0
c    (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0 ∧ -p_920) -> (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧ -b^{92, 11}_0)
c  in CNF:
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_2
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_1
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_0
c  in DIMACS:
 19088  19089 -19090  920 -19091 0
 19088  19089 -19090  920 -19092 0
 19088  19089 -19090  920 -19093 0

c  0-1 --> -1
c    (-b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧ -p_920) -> ( b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0)
c  in CNF:
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨  b^{92, 11}_2
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_1
c     b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨  b^{92, 11}_0
c  in DIMACS:
 19088  19089  19090  920  19091 0
 19088  19089  19090  920 -19092 0
 19088  19089  19090  920  19093 0

c  -1-1 --> -2
c    ( b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧  b^{92, 10}_0 ∧ -p_920) -> ( b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0)
c  in CNF:
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨  b^{92, 11}_2
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨  b^{92, 11}_1
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨  p_920 ∨ -b^{92, 11}_0
c  in DIMACS:
-19088  19089 -19090  920  19091 0
-19088  19089 -19090  920  19092 0
-19088  19089 -19090  920 -19093 0

c  -2-1 --> break 
c    ( b^{92, 10}_2 ∧  b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨  b^{92, 10}_0 ∨  p_920 ∨ break
c  in DIMACS:
-19088 -19089  19090  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 10}_2 ∧ -b^{92, 10}_1 ∧ -b^{92, 10}_0 ∧ true) 
c  in CNF:
c    -b^{92, 10}_2 ∨  b^{92, 10}_1 ∨  b^{92, 10}_0 ∨ false 
c  in DIMACS:
-19088  19089  19090  0

c  3 does not represent an automaton state.
c    -(-b^{92, 10}_2 ∧  b^{92, 10}_1 ∧  b^{92, 10}_0 ∧ true) 
c  in CNF:
c     b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ false 
c  in DIMACS:
 19088 -19089 -19090  0
c  -3 does not represent an automaton state.
c    -( b^{92, 10}_2 ∧  b^{92, 10}_1 ∧  b^{92, 10}_0 ∧ true) 
c  in CNF:
c    -b^{92, 10}_2 ∨ -b^{92, 10}_1 ∨ -b^{92, 10}_0 ∨ false 
c  in DIMACS:
-19088 -19089 -19090  0

c i = 11
c  -2+1 --> -1
c    ( b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧  p_1012) -> ( b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0)
c  in CNF:
c    -b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨  b^{92, 12}_2
c    -b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_1
c    -b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨  b^{92, 12}_0
c  in DIMACS:
-19091 -19092  19093 -1012  19094 0
-19091 -19092  19093 -1012 -19095 0
-19091 -19092  19093 -1012  19096 0

c  -1+1 --> 0
c    ( b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0 ∧  p_1012) -> (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧ -b^{92, 12}_0)
c  in CNF:
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_2
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_1
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_0
c  in DIMACS:
-19091  19092 -19093 -1012 -19094 0
-19091  19092 -19093 -1012 -19095 0
-19091  19092 -19093 -1012 -19096 0

c  0+1 --> 1
c    (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧  p_1012) -> (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0)
c  in CNF:
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_2
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_1
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨  b^{92, 12}_0
c  in DIMACS:
 19091  19092  19093 -1012 -19094 0
 19091  19092  19093 -1012 -19095 0
 19091  19092  19093 -1012  19096 0

c  1+1 --> 2
c    (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0 ∧  p_1012) -> (-b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0)
c  in CNF:
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_2
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨  b^{92, 12}_1
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ -p_1012 ∨ -b^{92, 12}_0
c  in DIMACS:
 19091  19092 -19093 -1012 -19094 0
 19091  19092 -19093 -1012  19095 0
 19091  19092 -19093 -1012 -19096 0

c  2+1 --> break 
c    (-b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 19091 -19092  19093 -1012 1162 0


c  2-1 --> 1
c    (-b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧ -p_1012) -> (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0)
c  in CNF:
c     b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_2
c     b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_1
c     b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨  b^{92, 12}_0
c  in DIMACS:
 19091 -19092  19093  1012 -19094 0
 19091 -19092  19093  1012 -19095 0
 19091 -19092  19093  1012  19096 0

c  1-1 --> 0
c    (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0 ∧ -p_1012) -> (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧ -b^{92, 12}_0)
c  in CNF:
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_2
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_1
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_0
c  in DIMACS:
 19091  19092 -19093  1012 -19094 0
 19091  19092 -19093  1012 -19095 0
 19091  19092 -19093  1012 -19096 0

c  0-1 --> -1
c    (-b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧ -p_1012) -> ( b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0)
c  in CNF:
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨  b^{92, 12}_2
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_1
c     b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨  b^{92, 12}_0
c  in DIMACS:
 19091  19092  19093  1012  19094 0
 19091  19092  19093  1012 -19095 0
 19091  19092  19093  1012  19096 0

c  -1-1 --> -2
c    ( b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧  b^{92, 11}_0 ∧ -p_1012) -> ( b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0)
c  in CNF:
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨  b^{92, 12}_2
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨  b^{92, 12}_1
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨  p_1012 ∨ -b^{92, 12}_0
c  in DIMACS:
-19091  19092 -19093  1012  19094 0
-19091  19092 -19093  1012  19095 0
-19091  19092 -19093  1012 -19096 0

c  -2-1 --> break 
c    ( b^{92, 11}_2 ∧  b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨  b^{92, 11}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-19091 -19092  19093  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 11}_2 ∧ -b^{92, 11}_1 ∧ -b^{92, 11}_0 ∧ true) 
c  in CNF:
c    -b^{92, 11}_2 ∨  b^{92, 11}_1 ∨  b^{92, 11}_0 ∨ false 
c  in DIMACS:
-19091  19092  19093  0

c  3 does not represent an automaton state.
c    -(-b^{92, 11}_2 ∧  b^{92, 11}_1 ∧  b^{92, 11}_0 ∧ true) 
c  in CNF:
c     b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ false 
c  in DIMACS:
 19091 -19092 -19093  0
c  -3 does not represent an automaton state.
c    -( b^{92, 11}_2 ∧  b^{92, 11}_1 ∧  b^{92, 11}_0 ∧ true) 
c  in CNF:
c    -b^{92, 11}_2 ∨ -b^{92, 11}_1 ∨ -b^{92, 11}_0 ∨ false 
c  in DIMACS:
-19091 -19092 -19093  0

c i = 12
c  -2+1 --> -1
c    ( b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧  p_1104) -> ( b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧  b^{92, 13}_0)
c  in CNF:
c    -b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨  b^{92, 13}_2
c    -b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_1
c    -b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨  b^{92, 13}_0
c  in DIMACS:
-19094 -19095  19096 -1104  19097 0
-19094 -19095  19096 -1104 -19098 0
-19094 -19095  19096 -1104  19099 0

c  -1+1 --> 0
c    ( b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0 ∧  p_1104) -> (-b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧ -b^{92, 13}_0)
c  in CNF:
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_2
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_1
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_0
c  in DIMACS:
-19094  19095 -19096 -1104 -19097 0
-19094  19095 -19096 -1104 -19098 0
-19094  19095 -19096 -1104 -19099 0

c  0+1 --> 1
c    (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧  p_1104) -> (-b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧  b^{92, 13}_0)
c  in CNF:
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_2
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_1
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨  b^{92, 13}_0
c  in DIMACS:
 19094  19095  19096 -1104 -19097 0
 19094  19095  19096 -1104 -19098 0
 19094  19095  19096 -1104  19099 0

c  1+1 --> 2
c    (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0 ∧  p_1104) -> (-b^{92, 13}_2 ∧  b^{92, 13}_1 ∧ -b^{92, 13}_0)
c  in CNF:
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_2
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨  b^{92, 13}_1
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ -p_1104 ∨ -b^{92, 13}_0
c  in DIMACS:
 19094  19095 -19096 -1104 -19097 0
 19094  19095 -19096 -1104  19098 0
 19094  19095 -19096 -1104 -19099 0

c  2+1 --> break 
c    (-b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 19094 -19095  19096 -1104 1162 0


c  2-1 --> 1
c    (-b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧ -p_1104) -> (-b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧  b^{92, 13}_0)
c  in CNF:
c     b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_2
c     b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_1
c     b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨  b^{92, 13}_0
c  in DIMACS:
 19094 -19095  19096  1104 -19097 0
 19094 -19095  19096  1104 -19098 0
 19094 -19095  19096  1104  19099 0

c  1-1 --> 0
c    (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0 ∧ -p_1104) -> (-b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧ -b^{92, 13}_0)
c  in CNF:
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_2
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_1
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_0
c  in DIMACS:
 19094  19095 -19096  1104 -19097 0
 19094  19095 -19096  1104 -19098 0
 19094  19095 -19096  1104 -19099 0

c  0-1 --> -1
c    (-b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧ -p_1104) -> ( b^{92, 13}_2 ∧ -b^{92, 13}_1 ∧  b^{92, 13}_0)
c  in CNF:
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨  b^{92, 13}_2
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_1
c     b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨  b^{92, 13}_0
c  in DIMACS:
 19094  19095  19096  1104  19097 0
 19094  19095  19096  1104 -19098 0
 19094  19095  19096  1104  19099 0

c  -1-1 --> -2
c    ( b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧  b^{92, 12}_0 ∧ -p_1104) -> ( b^{92, 13}_2 ∧  b^{92, 13}_1 ∧ -b^{92, 13}_0)
c  in CNF:
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨  b^{92, 13}_2
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨  b^{92, 13}_1
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨  p_1104 ∨ -b^{92, 13}_0
c  in DIMACS:
-19094  19095 -19096  1104  19097 0
-19094  19095 -19096  1104  19098 0
-19094  19095 -19096  1104 -19099 0

c  -2-1 --> break 
c    ( b^{92, 12}_2 ∧  b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨  b^{92, 12}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-19094 -19095  19096  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{92, 12}_2 ∧ -b^{92, 12}_1 ∧ -b^{92, 12}_0 ∧ true) 
c  in CNF:
c    -b^{92, 12}_2 ∨  b^{92, 12}_1 ∨  b^{92, 12}_0 ∨ false 
c  in DIMACS:
-19094  19095  19096  0

c  3 does not represent an automaton state.
c    -(-b^{92, 12}_2 ∧  b^{92, 12}_1 ∧  b^{92, 12}_0 ∧ true) 
c  in CNF:
c     b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ false 
c  in DIMACS:
 19094 -19095 -19096  0
c  -3 does not represent an automaton state.
c    -( b^{92, 12}_2 ∧  b^{92, 12}_1 ∧  b^{92, 12}_0 ∧ true) 
c  in CNF:
c    -b^{92, 12}_2 ∨ -b^{92, 12}_1 ∨ -b^{92, 12}_0 ∨ false 
c  in DIMACS:
-19094 -19095 -19096  0

c INIT for k = 93
c    -b^{93, 1}_2
c    -b^{93, 1}_1
c    -b^{93, 1}_0
c  in DIMACS:
-19100 0
-19101 0
-19102 0

c Transitions for k = 93
c i = 1
c  -2+1 --> -1
c    ( b^{93, 1}_2 ∧  b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧  p_93) -> ( b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0)
c  in CNF:
c    -b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨  b^{93, 2}_2
c    -b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_1
c    -b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨  b^{93, 2}_0
c  in DIMACS:
-19100 -19101  19102 -93  19103 0
-19100 -19101  19102 -93 -19104 0
-19100 -19101  19102 -93  19105 0

c  -1+1 --> 0
c    ( b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧  b^{93, 1}_0 ∧  p_93) -> (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧ -b^{93, 2}_0)
c  in CNF:
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_2
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_1
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_0
c  in DIMACS:
-19100  19101 -19102 -93 -19103 0
-19100  19101 -19102 -93 -19104 0
-19100  19101 -19102 -93 -19105 0

c  0+1 --> 1
c    (-b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧  p_93) -> (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0)
c  in CNF:
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_2
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_1
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨  b^{93, 2}_0
c  in DIMACS:
 19100  19101  19102 -93 -19103 0
 19100  19101  19102 -93 -19104 0
 19100  19101  19102 -93  19105 0

c  1+1 --> 2
c    (-b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧  b^{93, 1}_0 ∧  p_93) -> (-b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0)
c  in CNF:
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_2
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨  b^{93, 2}_1
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ -p_93 ∨ -b^{93, 2}_0
c  in DIMACS:
 19100  19101 -19102 -93 -19103 0
 19100  19101 -19102 -93  19104 0
 19100  19101 -19102 -93 -19105 0

c  2+1 --> break 
c    (-b^{93, 1}_2 ∧  b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧  p_93) -> break
c  in CNF:
c     b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ -p_93 ∨ break
c  in DIMACS:
 19100 -19101  19102 -93 1162 0


c  2-1 --> 1
c    (-b^{93, 1}_2 ∧  b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧ -p_93) -> (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0)
c  in CNF:
c     b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_2
c     b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_1
c     b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨  b^{93, 2}_0
c  in DIMACS:
 19100 -19101  19102  93 -19103 0
 19100 -19101  19102  93 -19104 0
 19100 -19101  19102  93  19105 0

c  1-1 --> 0
c    (-b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧  b^{93, 1}_0 ∧ -p_93) -> (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧ -b^{93, 2}_0)
c  in CNF:
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_2
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_1
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_0
c  in DIMACS:
 19100  19101 -19102  93 -19103 0
 19100  19101 -19102  93 -19104 0
 19100  19101 -19102  93 -19105 0

c  0-1 --> -1
c    (-b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧ -p_93) -> ( b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0)
c  in CNF:
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨  b^{93, 2}_2
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_1
c     b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨  b^{93, 2}_0
c  in DIMACS:
 19100  19101  19102  93  19103 0
 19100  19101  19102  93 -19104 0
 19100  19101  19102  93  19105 0

c  -1-1 --> -2
c    ( b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧  b^{93, 1}_0 ∧ -p_93) -> ( b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0)
c  in CNF:
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨  b^{93, 2}_2
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨  b^{93, 2}_1
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨  p_93 ∨ -b^{93, 2}_0
c  in DIMACS:
-19100  19101 -19102  93  19103 0
-19100  19101 -19102  93  19104 0
-19100  19101 -19102  93 -19105 0

c  -2-1 --> break 
c    ( b^{93, 1}_2 ∧  b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧ -p_93) -> break
c  in CNF:
c    -b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨  b^{93, 1}_0 ∨  p_93 ∨ break
c  in DIMACS:
-19100 -19101  19102  93 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 1}_2 ∧ -b^{93, 1}_1 ∧ -b^{93, 1}_0 ∧ true) 
c  in CNF:
c    -b^{93, 1}_2 ∨  b^{93, 1}_1 ∨  b^{93, 1}_0 ∨ false 
c  in DIMACS:
-19100  19101  19102  0

c  3 does not represent an automaton state.
c    -(-b^{93, 1}_2 ∧  b^{93, 1}_1 ∧  b^{93, 1}_0 ∧ true) 
c  in CNF:
c     b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ false 
c  in DIMACS:
 19100 -19101 -19102  0
c  -3 does not represent an automaton state.
c    -( b^{93, 1}_2 ∧  b^{93, 1}_1 ∧  b^{93, 1}_0 ∧ true) 
c  in CNF:
c    -b^{93, 1}_2 ∨ -b^{93, 1}_1 ∨ -b^{93, 1}_0 ∨ false 
c  in DIMACS:
-19100 -19101 -19102  0

c i = 2
c  -2+1 --> -1
c    ( b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧  p_186) -> ( b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0)
c  in CNF:
c    -b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨  b^{93, 3}_2
c    -b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_1
c    -b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨  b^{93, 3}_0
c  in DIMACS:
-19103 -19104  19105 -186  19106 0
-19103 -19104  19105 -186 -19107 0
-19103 -19104  19105 -186  19108 0

c  -1+1 --> 0
c    ( b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0 ∧  p_186) -> (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧ -b^{93, 3}_0)
c  in CNF:
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_2
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_1
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_0
c  in DIMACS:
-19103  19104 -19105 -186 -19106 0
-19103  19104 -19105 -186 -19107 0
-19103  19104 -19105 -186 -19108 0

c  0+1 --> 1
c    (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧  p_186) -> (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0)
c  in CNF:
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_2
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_1
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨  b^{93, 3}_0
c  in DIMACS:
 19103  19104  19105 -186 -19106 0
 19103  19104  19105 -186 -19107 0
 19103  19104  19105 -186  19108 0

c  1+1 --> 2
c    (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0 ∧  p_186) -> (-b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0)
c  in CNF:
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_2
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨  b^{93, 3}_1
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ -p_186 ∨ -b^{93, 3}_0
c  in DIMACS:
 19103  19104 -19105 -186 -19106 0
 19103  19104 -19105 -186  19107 0
 19103  19104 -19105 -186 -19108 0

c  2+1 --> break 
c    (-b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧  p_186) -> break
c  in CNF:
c     b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 19103 -19104  19105 -186 1162 0


c  2-1 --> 1
c    (-b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧ -p_186) -> (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0)
c  in CNF:
c     b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_2
c     b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_1
c     b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨  b^{93, 3}_0
c  in DIMACS:
 19103 -19104  19105  186 -19106 0
 19103 -19104  19105  186 -19107 0
 19103 -19104  19105  186  19108 0

c  1-1 --> 0
c    (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0 ∧ -p_186) -> (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧ -b^{93, 3}_0)
c  in CNF:
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_2
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_1
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_0
c  in DIMACS:
 19103  19104 -19105  186 -19106 0
 19103  19104 -19105  186 -19107 0
 19103  19104 -19105  186 -19108 0

c  0-1 --> -1
c    (-b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧ -p_186) -> ( b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0)
c  in CNF:
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨  b^{93, 3}_2
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_1
c     b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨  b^{93, 3}_0
c  in DIMACS:
 19103  19104  19105  186  19106 0
 19103  19104  19105  186 -19107 0
 19103  19104  19105  186  19108 0

c  -1-1 --> -2
c    ( b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧  b^{93, 2}_0 ∧ -p_186) -> ( b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0)
c  in CNF:
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨  b^{93, 3}_2
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨  b^{93, 3}_1
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨  p_186 ∨ -b^{93, 3}_0
c  in DIMACS:
-19103  19104 -19105  186  19106 0
-19103  19104 -19105  186  19107 0
-19103  19104 -19105  186 -19108 0

c  -2-1 --> break 
c    ( b^{93, 2}_2 ∧  b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨  b^{93, 2}_0 ∨  p_186 ∨ break
c  in DIMACS:
-19103 -19104  19105  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 2}_2 ∧ -b^{93, 2}_1 ∧ -b^{93, 2}_0 ∧ true) 
c  in CNF:
c    -b^{93, 2}_2 ∨  b^{93, 2}_1 ∨  b^{93, 2}_0 ∨ false 
c  in DIMACS:
-19103  19104  19105  0

c  3 does not represent an automaton state.
c    -(-b^{93, 2}_2 ∧  b^{93, 2}_1 ∧  b^{93, 2}_0 ∧ true) 
c  in CNF:
c     b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ false 
c  in DIMACS:
 19103 -19104 -19105  0
c  -3 does not represent an automaton state.
c    -( b^{93, 2}_2 ∧  b^{93, 2}_1 ∧  b^{93, 2}_0 ∧ true) 
c  in CNF:
c    -b^{93, 2}_2 ∨ -b^{93, 2}_1 ∨ -b^{93, 2}_0 ∨ false 
c  in DIMACS:
-19103 -19104 -19105  0

c i = 3
c  -2+1 --> -1
c    ( b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧  p_279) -> ( b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0)
c  in CNF:
c    -b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨  b^{93, 4}_2
c    -b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_1
c    -b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨  b^{93, 4}_0
c  in DIMACS:
-19106 -19107  19108 -279  19109 0
-19106 -19107  19108 -279 -19110 0
-19106 -19107  19108 -279  19111 0

c  -1+1 --> 0
c    ( b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0 ∧  p_279) -> (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧ -b^{93, 4}_0)
c  in CNF:
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_2
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_1
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_0
c  in DIMACS:
-19106  19107 -19108 -279 -19109 0
-19106  19107 -19108 -279 -19110 0
-19106  19107 -19108 -279 -19111 0

c  0+1 --> 1
c    (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧  p_279) -> (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0)
c  in CNF:
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_2
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_1
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨  b^{93, 4}_0
c  in DIMACS:
 19106  19107  19108 -279 -19109 0
 19106  19107  19108 -279 -19110 0
 19106  19107  19108 -279  19111 0

c  1+1 --> 2
c    (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0 ∧  p_279) -> (-b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0)
c  in CNF:
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_2
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨  b^{93, 4}_1
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ -p_279 ∨ -b^{93, 4}_0
c  in DIMACS:
 19106  19107 -19108 -279 -19109 0
 19106  19107 -19108 -279  19110 0
 19106  19107 -19108 -279 -19111 0

c  2+1 --> break 
c    (-b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧  p_279) -> break
c  in CNF:
c     b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 19106 -19107  19108 -279 1162 0


c  2-1 --> 1
c    (-b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧ -p_279) -> (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0)
c  in CNF:
c     b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_2
c     b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_1
c     b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨  b^{93, 4}_0
c  in DIMACS:
 19106 -19107  19108  279 -19109 0
 19106 -19107  19108  279 -19110 0
 19106 -19107  19108  279  19111 0

c  1-1 --> 0
c    (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0 ∧ -p_279) -> (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧ -b^{93, 4}_0)
c  in CNF:
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_2
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_1
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_0
c  in DIMACS:
 19106  19107 -19108  279 -19109 0
 19106  19107 -19108  279 -19110 0
 19106  19107 -19108  279 -19111 0

c  0-1 --> -1
c    (-b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧ -p_279) -> ( b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0)
c  in CNF:
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨  b^{93, 4}_2
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_1
c     b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨  b^{93, 4}_0
c  in DIMACS:
 19106  19107  19108  279  19109 0
 19106  19107  19108  279 -19110 0
 19106  19107  19108  279  19111 0

c  -1-1 --> -2
c    ( b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧  b^{93, 3}_0 ∧ -p_279) -> ( b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0)
c  in CNF:
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨  b^{93, 4}_2
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨  b^{93, 4}_1
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨  p_279 ∨ -b^{93, 4}_0
c  in DIMACS:
-19106  19107 -19108  279  19109 0
-19106  19107 -19108  279  19110 0
-19106  19107 -19108  279 -19111 0

c  -2-1 --> break 
c    ( b^{93, 3}_2 ∧  b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨  b^{93, 3}_0 ∨  p_279 ∨ break
c  in DIMACS:
-19106 -19107  19108  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 3}_2 ∧ -b^{93, 3}_1 ∧ -b^{93, 3}_0 ∧ true) 
c  in CNF:
c    -b^{93, 3}_2 ∨  b^{93, 3}_1 ∨  b^{93, 3}_0 ∨ false 
c  in DIMACS:
-19106  19107  19108  0

c  3 does not represent an automaton state.
c    -(-b^{93, 3}_2 ∧  b^{93, 3}_1 ∧  b^{93, 3}_0 ∧ true) 
c  in CNF:
c     b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ false 
c  in DIMACS:
 19106 -19107 -19108  0
c  -3 does not represent an automaton state.
c    -( b^{93, 3}_2 ∧  b^{93, 3}_1 ∧  b^{93, 3}_0 ∧ true) 
c  in CNF:
c    -b^{93, 3}_2 ∨ -b^{93, 3}_1 ∨ -b^{93, 3}_0 ∨ false 
c  in DIMACS:
-19106 -19107 -19108  0

c i = 4
c  -2+1 --> -1
c    ( b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧  p_372) -> ( b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0)
c  in CNF:
c    -b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨  b^{93, 5}_2
c    -b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_1
c    -b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨  b^{93, 5}_0
c  in DIMACS:
-19109 -19110  19111 -372  19112 0
-19109 -19110  19111 -372 -19113 0
-19109 -19110  19111 -372  19114 0

c  -1+1 --> 0
c    ( b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0 ∧  p_372) -> (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧ -b^{93, 5}_0)
c  in CNF:
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_2
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_1
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_0
c  in DIMACS:
-19109  19110 -19111 -372 -19112 0
-19109  19110 -19111 -372 -19113 0
-19109  19110 -19111 -372 -19114 0

c  0+1 --> 1
c    (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧  p_372) -> (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0)
c  in CNF:
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_2
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_1
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨  b^{93, 5}_0
c  in DIMACS:
 19109  19110  19111 -372 -19112 0
 19109  19110  19111 -372 -19113 0
 19109  19110  19111 -372  19114 0

c  1+1 --> 2
c    (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0 ∧  p_372) -> (-b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0)
c  in CNF:
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_2
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨  b^{93, 5}_1
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ -p_372 ∨ -b^{93, 5}_0
c  in DIMACS:
 19109  19110 -19111 -372 -19112 0
 19109  19110 -19111 -372  19113 0
 19109  19110 -19111 -372 -19114 0

c  2+1 --> break 
c    (-b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧  p_372) -> break
c  in CNF:
c     b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 19109 -19110  19111 -372 1162 0


c  2-1 --> 1
c    (-b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧ -p_372) -> (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0)
c  in CNF:
c     b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_2
c     b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_1
c     b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨  b^{93, 5}_0
c  in DIMACS:
 19109 -19110  19111  372 -19112 0
 19109 -19110  19111  372 -19113 0
 19109 -19110  19111  372  19114 0

c  1-1 --> 0
c    (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0 ∧ -p_372) -> (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧ -b^{93, 5}_0)
c  in CNF:
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_2
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_1
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_0
c  in DIMACS:
 19109  19110 -19111  372 -19112 0
 19109  19110 -19111  372 -19113 0
 19109  19110 -19111  372 -19114 0

c  0-1 --> -1
c    (-b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧ -p_372) -> ( b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0)
c  in CNF:
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨  b^{93, 5}_2
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_1
c     b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨  b^{93, 5}_0
c  in DIMACS:
 19109  19110  19111  372  19112 0
 19109  19110  19111  372 -19113 0
 19109  19110  19111  372  19114 0

c  -1-1 --> -2
c    ( b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧  b^{93, 4}_0 ∧ -p_372) -> ( b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0)
c  in CNF:
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨  b^{93, 5}_2
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨  b^{93, 5}_1
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨  p_372 ∨ -b^{93, 5}_0
c  in DIMACS:
-19109  19110 -19111  372  19112 0
-19109  19110 -19111  372  19113 0
-19109  19110 -19111  372 -19114 0

c  -2-1 --> break 
c    ( b^{93, 4}_2 ∧  b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨  b^{93, 4}_0 ∨  p_372 ∨ break
c  in DIMACS:
-19109 -19110  19111  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 4}_2 ∧ -b^{93, 4}_1 ∧ -b^{93, 4}_0 ∧ true) 
c  in CNF:
c    -b^{93, 4}_2 ∨  b^{93, 4}_1 ∨  b^{93, 4}_0 ∨ false 
c  in DIMACS:
-19109  19110  19111  0

c  3 does not represent an automaton state.
c    -(-b^{93, 4}_2 ∧  b^{93, 4}_1 ∧  b^{93, 4}_0 ∧ true) 
c  in CNF:
c     b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ false 
c  in DIMACS:
 19109 -19110 -19111  0
c  -3 does not represent an automaton state.
c    -( b^{93, 4}_2 ∧  b^{93, 4}_1 ∧  b^{93, 4}_0 ∧ true) 
c  in CNF:
c    -b^{93, 4}_2 ∨ -b^{93, 4}_1 ∨ -b^{93, 4}_0 ∨ false 
c  in DIMACS:
-19109 -19110 -19111  0

c i = 5
c  -2+1 --> -1
c    ( b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧  p_465) -> ( b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0)
c  in CNF:
c    -b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨  b^{93, 6}_2
c    -b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_1
c    -b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨  b^{93, 6}_0
c  in DIMACS:
-19112 -19113  19114 -465  19115 0
-19112 -19113  19114 -465 -19116 0
-19112 -19113  19114 -465  19117 0

c  -1+1 --> 0
c    ( b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0 ∧  p_465) -> (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧ -b^{93, 6}_0)
c  in CNF:
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_2
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_1
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_0
c  in DIMACS:
-19112  19113 -19114 -465 -19115 0
-19112  19113 -19114 -465 -19116 0
-19112  19113 -19114 -465 -19117 0

c  0+1 --> 1
c    (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧  p_465) -> (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0)
c  in CNF:
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_2
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_1
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨  b^{93, 6}_0
c  in DIMACS:
 19112  19113  19114 -465 -19115 0
 19112  19113  19114 -465 -19116 0
 19112  19113  19114 -465  19117 0

c  1+1 --> 2
c    (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0 ∧  p_465) -> (-b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0)
c  in CNF:
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_2
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨  b^{93, 6}_1
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ -p_465 ∨ -b^{93, 6}_0
c  in DIMACS:
 19112  19113 -19114 -465 -19115 0
 19112  19113 -19114 -465  19116 0
 19112  19113 -19114 -465 -19117 0

c  2+1 --> break 
c    (-b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧  p_465) -> break
c  in CNF:
c     b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 19112 -19113  19114 -465 1162 0


c  2-1 --> 1
c    (-b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧ -p_465) -> (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0)
c  in CNF:
c     b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_2
c     b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_1
c     b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨  b^{93, 6}_0
c  in DIMACS:
 19112 -19113  19114  465 -19115 0
 19112 -19113  19114  465 -19116 0
 19112 -19113  19114  465  19117 0

c  1-1 --> 0
c    (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0 ∧ -p_465) -> (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧ -b^{93, 6}_0)
c  in CNF:
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_2
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_1
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_0
c  in DIMACS:
 19112  19113 -19114  465 -19115 0
 19112  19113 -19114  465 -19116 0
 19112  19113 -19114  465 -19117 0

c  0-1 --> -1
c    (-b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧ -p_465) -> ( b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0)
c  in CNF:
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨  b^{93, 6}_2
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_1
c     b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨  b^{93, 6}_0
c  in DIMACS:
 19112  19113  19114  465  19115 0
 19112  19113  19114  465 -19116 0
 19112  19113  19114  465  19117 0

c  -1-1 --> -2
c    ( b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧  b^{93, 5}_0 ∧ -p_465) -> ( b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0)
c  in CNF:
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨  b^{93, 6}_2
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨  b^{93, 6}_1
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨  p_465 ∨ -b^{93, 6}_0
c  in DIMACS:
-19112  19113 -19114  465  19115 0
-19112  19113 -19114  465  19116 0
-19112  19113 -19114  465 -19117 0

c  -2-1 --> break 
c    ( b^{93, 5}_2 ∧  b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨  b^{93, 5}_0 ∨  p_465 ∨ break
c  in DIMACS:
-19112 -19113  19114  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 5}_2 ∧ -b^{93, 5}_1 ∧ -b^{93, 5}_0 ∧ true) 
c  in CNF:
c    -b^{93, 5}_2 ∨  b^{93, 5}_1 ∨  b^{93, 5}_0 ∨ false 
c  in DIMACS:
-19112  19113  19114  0

c  3 does not represent an automaton state.
c    -(-b^{93, 5}_2 ∧  b^{93, 5}_1 ∧  b^{93, 5}_0 ∧ true) 
c  in CNF:
c     b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ false 
c  in DIMACS:
 19112 -19113 -19114  0
c  -3 does not represent an automaton state.
c    -( b^{93, 5}_2 ∧  b^{93, 5}_1 ∧  b^{93, 5}_0 ∧ true) 
c  in CNF:
c    -b^{93, 5}_2 ∨ -b^{93, 5}_1 ∨ -b^{93, 5}_0 ∨ false 
c  in DIMACS:
-19112 -19113 -19114  0

c i = 6
c  -2+1 --> -1
c    ( b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧  p_558) -> ( b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0)
c  in CNF:
c    -b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨  b^{93, 7}_2
c    -b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_1
c    -b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨  b^{93, 7}_0
c  in DIMACS:
-19115 -19116  19117 -558  19118 0
-19115 -19116  19117 -558 -19119 0
-19115 -19116  19117 -558  19120 0

c  -1+1 --> 0
c    ( b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0 ∧  p_558) -> (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧ -b^{93, 7}_0)
c  in CNF:
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_2
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_1
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_0
c  in DIMACS:
-19115  19116 -19117 -558 -19118 0
-19115  19116 -19117 -558 -19119 0
-19115  19116 -19117 -558 -19120 0

c  0+1 --> 1
c    (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧  p_558) -> (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0)
c  in CNF:
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_2
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_1
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨  b^{93, 7}_0
c  in DIMACS:
 19115  19116  19117 -558 -19118 0
 19115  19116  19117 -558 -19119 0
 19115  19116  19117 -558  19120 0

c  1+1 --> 2
c    (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0 ∧  p_558) -> (-b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0)
c  in CNF:
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_2
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨  b^{93, 7}_1
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ -p_558 ∨ -b^{93, 7}_0
c  in DIMACS:
 19115  19116 -19117 -558 -19118 0
 19115  19116 -19117 -558  19119 0
 19115  19116 -19117 -558 -19120 0

c  2+1 --> break 
c    (-b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧  p_558) -> break
c  in CNF:
c     b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 19115 -19116  19117 -558 1162 0


c  2-1 --> 1
c    (-b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧ -p_558) -> (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0)
c  in CNF:
c     b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_2
c     b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_1
c     b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨  b^{93, 7}_0
c  in DIMACS:
 19115 -19116  19117  558 -19118 0
 19115 -19116  19117  558 -19119 0
 19115 -19116  19117  558  19120 0

c  1-1 --> 0
c    (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0 ∧ -p_558) -> (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧ -b^{93, 7}_0)
c  in CNF:
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_2
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_1
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_0
c  in DIMACS:
 19115  19116 -19117  558 -19118 0
 19115  19116 -19117  558 -19119 0
 19115  19116 -19117  558 -19120 0

c  0-1 --> -1
c    (-b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧ -p_558) -> ( b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0)
c  in CNF:
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨  b^{93, 7}_2
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_1
c     b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨  b^{93, 7}_0
c  in DIMACS:
 19115  19116  19117  558  19118 0
 19115  19116  19117  558 -19119 0
 19115  19116  19117  558  19120 0

c  -1-1 --> -2
c    ( b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧  b^{93, 6}_0 ∧ -p_558) -> ( b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0)
c  in CNF:
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨  b^{93, 7}_2
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨  b^{93, 7}_1
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨  p_558 ∨ -b^{93, 7}_0
c  in DIMACS:
-19115  19116 -19117  558  19118 0
-19115  19116 -19117  558  19119 0
-19115  19116 -19117  558 -19120 0

c  -2-1 --> break 
c    ( b^{93, 6}_2 ∧  b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨  b^{93, 6}_0 ∨  p_558 ∨ break
c  in DIMACS:
-19115 -19116  19117  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 6}_2 ∧ -b^{93, 6}_1 ∧ -b^{93, 6}_0 ∧ true) 
c  in CNF:
c    -b^{93, 6}_2 ∨  b^{93, 6}_1 ∨  b^{93, 6}_0 ∨ false 
c  in DIMACS:
-19115  19116  19117  0

c  3 does not represent an automaton state.
c    -(-b^{93, 6}_2 ∧  b^{93, 6}_1 ∧  b^{93, 6}_0 ∧ true) 
c  in CNF:
c     b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ false 
c  in DIMACS:
 19115 -19116 -19117  0
c  -3 does not represent an automaton state.
c    -( b^{93, 6}_2 ∧  b^{93, 6}_1 ∧  b^{93, 6}_0 ∧ true) 
c  in CNF:
c    -b^{93, 6}_2 ∨ -b^{93, 6}_1 ∨ -b^{93, 6}_0 ∨ false 
c  in DIMACS:
-19115 -19116 -19117  0

c i = 7
c  -2+1 --> -1
c    ( b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧  p_651) -> ( b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0)
c  in CNF:
c    -b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨  b^{93, 8}_2
c    -b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_1
c    -b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨  b^{93, 8}_0
c  in DIMACS:
-19118 -19119  19120 -651  19121 0
-19118 -19119  19120 -651 -19122 0
-19118 -19119  19120 -651  19123 0

c  -1+1 --> 0
c    ( b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0 ∧  p_651) -> (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧ -b^{93, 8}_0)
c  in CNF:
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_2
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_1
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_0
c  in DIMACS:
-19118  19119 -19120 -651 -19121 0
-19118  19119 -19120 -651 -19122 0
-19118  19119 -19120 -651 -19123 0

c  0+1 --> 1
c    (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧  p_651) -> (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0)
c  in CNF:
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_2
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_1
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨  b^{93, 8}_0
c  in DIMACS:
 19118  19119  19120 -651 -19121 0
 19118  19119  19120 -651 -19122 0
 19118  19119  19120 -651  19123 0

c  1+1 --> 2
c    (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0 ∧  p_651) -> (-b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0)
c  in CNF:
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_2
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨  b^{93, 8}_1
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ -p_651 ∨ -b^{93, 8}_0
c  in DIMACS:
 19118  19119 -19120 -651 -19121 0
 19118  19119 -19120 -651  19122 0
 19118  19119 -19120 -651 -19123 0

c  2+1 --> break 
c    (-b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧  p_651) -> break
c  in CNF:
c     b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 19118 -19119  19120 -651 1162 0


c  2-1 --> 1
c    (-b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧ -p_651) -> (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0)
c  in CNF:
c     b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_2
c     b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_1
c     b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨  b^{93, 8}_0
c  in DIMACS:
 19118 -19119  19120  651 -19121 0
 19118 -19119  19120  651 -19122 0
 19118 -19119  19120  651  19123 0

c  1-1 --> 0
c    (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0 ∧ -p_651) -> (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧ -b^{93, 8}_0)
c  in CNF:
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_2
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_1
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_0
c  in DIMACS:
 19118  19119 -19120  651 -19121 0
 19118  19119 -19120  651 -19122 0
 19118  19119 -19120  651 -19123 0

c  0-1 --> -1
c    (-b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧ -p_651) -> ( b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0)
c  in CNF:
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨  b^{93, 8}_2
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_1
c     b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨  b^{93, 8}_0
c  in DIMACS:
 19118  19119  19120  651  19121 0
 19118  19119  19120  651 -19122 0
 19118  19119  19120  651  19123 0

c  -1-1 --> -2
c    ( b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧  b^{93, 7}_0 ∧ -p_651) -> ( b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0)
c  in CNF:
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨  b^{93, 8}_2
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨  b^{93, 8}_1
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨  p_651 ∨ -b^{93, 8}_0
c  in DIMACS:
-19118  19119 -19120  651  19121 0
-19118  19119 -19120  651  19122 0
-19118  19119 -19120  651 -19123 0

c  -2-1 --> break 
c    ( b^{93, 7}_2 ∧  b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨  b^{93, 7}_0 ∨  p_651 ∨ break
c  in DIMACS:
-19118 -19119  19120  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 7}_2 ∧ -b^{93, 7}_1 ∧ -b^{93, 7}_0 ∧ true) 
c  in CNF:
c    -b^{93, 7}_2 ∨  b^{93, 7}_1 ∨  b^{93, 7}_0 ∨ false 
c  in DIMACS:
-19118  19119  19120  0

c  3 does not represent an automaton state.
c    -(-b^{93, 7}_2 ∧  b^{93, 7}_1 ∧  b^{93, 7}_0 ∧ true) 
c  in CNF:
c     b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ false 
c  in DIMACS:
 19118 -19119 -19120  0
c  -3 does not represent an automaton state.
c    -( b^{93, 7}_2 ∧  b^{93, 7}_1 ∧  b^{93, 7}_0 ∧ true) 
c  in CNF:
c    -b^{93, 7}_2 ∨ -b^{93, 7}_1 ∨ -b^{93, 7}_0 ∨ false 
c  in DIMACS:
-19118 -19119 -19120  0

c i = 8
c  -2+1 --> -1
c    ( b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧  p_744) -> ( b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0)
c  in CNF:
c    -b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨  b^{93, 9}_2
c    -b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_1
c    -b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨  b^{93, 9}_0
c  in DIMACS:
-19121 -19122  19123 -744  19124 0
-19121 -19122  19123 -744 -19125 0
-19121 -19122  19123 -744  19126 0

c  -1+1 --> 0
c    ( b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0 ∧  p_744) -> (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧ -b^{93, 9}_0)
c  in CNF:
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_2
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_1
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_0
c  in DIMACS:
-19121  19122 -19123 -744 -19124 0
-19121  19122 -19123 -744 -19125 0
-19121  19122 -19123 -744 -19126 0

c  0+1 --> 1
c    (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧  p_744) -> (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0)
c  in CNF:
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_2
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_1
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨  b^{93, 9}_0
c  in DIMACS:
 19121  19122  19123 -744 -19124 0
 19121  19122  19123 -744 -19125 0
 19121  19122  19123 -744  19126 0

c  1+1 --> 2
c    (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0 ∧  p_744) -> (-b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0)
c  in CNF:
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_2
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨  b^{93, 9}_1
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ -p_744 ∨ -b^{93, 9}_0
c  in DIMACS:
 19121  19122 -19123 -744 -19124 0
 19121  19122 -19123 -744  19125 0
 19121  19122 -19123 -744 -19126 0

c  2+1 --> break 
c    (-b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧  p_744) -> break
c  in CNF:
c     b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 19121 -19122  19123 -744 1162 0


c  2-1 --> 1
c    (-b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧ -p_744) -> (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0)
c  in CNF:
c     b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_2
c     b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_1
c     b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨  b^{93, 9}_0
c  in DIMACS:
 19121 -19122  19123  744 -19124 0
 19121 -19122  19123  744 -19125 0
 19121 -19122  19123  744  19126 0

c  1-1 --> 0
c    (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0 ∧ -p_744) -> (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧ -b^{93, 9}_0)
c  in CNF:
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_2
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_1
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_0
c  in DIMACS:
 19121  19122 -19123  744 -19124 0
 19121  19122 -19123  744 -19125 0
 19121  19122 -19123  744 -19126 0

c  0-1 --> -1
c    (-b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧ -p_744) -> ( b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0)
c  in CNF:
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨  b^{93, 9}_2
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_1
c     b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨  b^{93, 9}_0
c  in DIMACS:
 19121  19122  19123  744  19124 0
 19121  19122  19123  744 -19125 0
 19121  19122  19123  744  19126 0

c  -1-1 --> -2
c    ( b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧  b^{93, 8}_0 ∧ -p_744) -> ( b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0)
c  in CNF:
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨  b^{93, 9}_2
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨  b^{93, 9}_1
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨  p_744 ∨ -b^{93, 9}_0
c  in DIMACS:
-19121  19122 -19123  744  19124 0
-19121  19122 -19123  744  19125 0
-19121  19122 -19123  744 -19126 0

c  -2-1 --> break 
c    ( b^{93, 8}_2 ∧  b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨  b^{93, 8}_0 ∨  p_744 ∨ break
c  in DIMACS:
-19121 -19122  19123  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 8}_2 ∧ -b^{93, 8}_1 ∧ -b^{93, 8}_0 ∧ true) 
c  in CNF:
c    -b^{93, 8}_2 ∨  b^{93, 8}_1 ∨  b^{93, 8}_0 ∨ false 
c  in DIMACS:
-19121  19122  19123  0

c  3 does not represent an automaton state.
c    -(-b^{93, 8}_2 ∧  b^{93, 8}_1 ∧  b^{93, 8}_0 ∧ true) 
c  in CNF:
c     b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ false 
c  in DIMACS:
 19121 -19122 -19123  0
c  -3 does not represent an automaton state.
c    -( b^{93, 8}_2 ∧  b^{93, 8}_1 ∧  b^{93, 8}_0 ∧ true) 
c  in CNF:
c    -b^{93, 8}_2 ∨ -b^{93, 8}_1 ∨ -b^{93, 8}_0 ∨ false 
c  in DIMACS:
-19121 -19122 -19123  0

c i = 9
c  -2+1 --> -1
c    ( b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧  p_837) -> ( b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0)
c  in CNF:
c    -b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨  b^{93, 10}_2
c    -b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_1
c    -b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨  b^{93, 10}_0
c  in DIMACS:
-19124 -19125  19126 -837  19127 0
-19124 -19125  19126 -837 -19128 0
-19124 -19125  19126 -837  19129 0

c  -1+1 --> 0
c    ( b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0 ∧  p_837) -> (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧ -b^{93, 10}_0)
c  in CNF:
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_2
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_1
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_0
c  in DIMACS:
-19124  19125 -19126 -837 -19127 0
-19124  19125 -19126 -837 -19128 0
-19124  19125 -19126 -837 -19129 0

c  0+1 --> 1
c    (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧  p_837) -> (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0)
c  in CNF:
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_2
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_1
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨  b^{93, 10}_0
c  in DIMACS:
 19124  19125  19126 -837 -19127 0
 19124  19125  19126 -837 -19128 0
 19124  19125  19126 -837  19129 0

c  1+1 --> 2
c    (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0 ∧  p_837) -> (-b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0)
c  in CNF:
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_2
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨  b^{93, 10}_1
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ -p_837 ∨ -b^{93, 10}_0
c  in DIMACS:
 19124  19125 -19126 -837 -19127 0
 19124  19125 -19126 -837  19128 0
 19124  19125 -19126 -837 -19129 0

c  2+1 --> break 
c    (-b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧  p_837) -> break
c  in CNF:
c     b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 19124 -19125  19126 -837 1162 0


c  2-1 --> 1
c    (-b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧ -p_837) -> (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0)
c  in CNF:
c     b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_2
c     b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_1
c     b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨  b^{93, 10}_0
c  in DIMACS:
 19124 -19125  19126  837 -19127 0
 19124 -19125  19126  837 -19128 0
 19124 -19125  19126  837  19129 0

c  1-1 --> 0
c    (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0 ∧ -p_837) -> (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧ -b^{93, 10}_0)
c  in CNF:
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_2
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_1
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_0
c  in DIMACS:
 19124  19125 -19126  837 -19127 0
 19124  19125 -19126  837 -19128 0
 19124  19125 -19126  837 -19129 0

c  0-1 --> -1
c    (-b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧ -p_837) -> ( b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0)
c  in CNF:
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨  b^{93, 10}_2
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_1
c     b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨  b^{93, 10}_0
c  in DIMACS:
 19124  19125  19126  837  19127 0
 19124  19125  19126  837 -19128 0
 19124  19125  19126  837  19129 0

c  -1-1 --> -2
c    ( b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧  b^{93, 9}_0 ∧ -p_837) -> ( b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0)
c  in CNF:
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨  b^{93, 10}_2
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨  b^{93, 10}_1
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨  p_837 ∨ -b^{93, 10}_0
c  in DIMACS:
-19124  19125 -19126  837  19127 0
-19124  19125 -19126  837  19128 0
-19124  19125 -19126  837 -19129 0

c  -2-1 --> break 
c    ( b^{93, 9}_2 ∧  b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨  b^{93, 9}_0 ∨  p_837 ∨ break
c  in DIMACS:
-19124 -19125  19126  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 9}_2 ∧ -b^{93, 9}_1 ∧ -b^{93, 9}_0 ∧ true) 
c  in CNF:
c    -b^{93, 9}_2 ∨  b^{93, 9}_1 ∨  b^{93, 9}_0 ∨ false 
c  in DIMACS:
-19124  19125  19126  0

c  3 does not represent an automaton state.
c    -(-b^{93, 9}_2 ∧  b^{93, 9}_1 ∧  b^{93, 9}_0 ∧ true) 
c  in CNF:
c     b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ false 
c  in DIMACS:
 19124 -19125 -19126  0
c  -3 does not represent an automaton state.
c    -( b^{93, 9}_2 ∧  b^{93, 9}_1 ∧  b^{93, 9}_0 ∧ true) 
c  in CNF:
c    -b^{93, 9}_2 ∨ -b^{93, 9}_1 ∨ -b^{93, 9}_0 ∨ false 
c  in DIMACS:
-19124 -19125 -19126  0

c i = 10
c  -2+1 --> -1
c    ( b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧  p_930) -> ( b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0)
c  in CNF:
c    -b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨  b^{93, 11}_2
c    -b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_1
c    -b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨  b^{93, 11}_0
c  in DIMACS:
-19127 -19128  19129 -930  19130 0
-19127 -19128  19129 -930 -19131 0
-19127 -19128  19129 -930  19132 0

c  -1+1 --> 0
c    ( b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0 ∧  p_930) -> (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧ -b^{93, 11}_0)
c  in CNF:
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_2
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_1
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_0
c  in DIMACS:
-19127  19128 -19129 -930 -19130 0
-19127  19128 -19129 -930 -19131 0
-19127  19128 -19129 -930 -19132 0

c  0+1 --> 1
c    (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧  p_930) -> (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0)
c  in CNF:
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_2
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_1
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨  b^{93, 11}_0
c  in DIMACS:
 19127  19128  19129 -930 -19130 0
 19127  19128  19129 -930 -19131 0
 19127  19128  19129 -930  19132 0

c  1+1 --> 2
c    (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0 ∧  p_930) -> (-b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0)
c  in CNF:
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_2
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨  b^{93, 11}_1
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ -p_930 ∨ -b^{93, 11}_0
c  in DIMACS:
 19127  19128 -19129 -930 -19130 0
 19127  19128 -19129 -930  19131 0
 19127  19128 -19129 -930 -19132 0

c  2+1 --> break 
c    (-b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧  p_930) -> break
c  in CNF:
c     b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 19127 -19128  19129 -930 1162 0


c  2-1 --> 1
c    (-b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧ -p_930) -> (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0)
c  in CNF:
c     b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_2
c     b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_1
c     b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨  b^{93, 11}_0
c  in DIMACS:
 19127 -19128  19129  930 -19130 0
 19127 -19128  19129  930 -19131 0
 19127 -19128  19129  930  19132 0

c  1-1 --> 0
c    (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0 ∧ -p_930) -> (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧ -b^{93, 11}_0)
c  in CNF:
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_2
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_1
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_0
c  in DIMACS:
 19127  19128 -19129  930 -19130 0
 19127  19128 -19129  930 -19131 0
 19127  19128 -19129  930 -19132 0

c  0-1 --> -1
c    (-b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧ -p_930) -> ( b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0)
c  in CNF:
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨  b^{93, 11}_2
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_1
c     b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨  b^{93, 11}_0
c  in DIMACS:
 19127  19128  19129  930  19130 0
 19127  19128  19129  930 -19131 0
 19127  19128  19129  930  19132 0

c  -1-1 --> -2
c    ( b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧  b^{93, 10}_0 ∧ -p_930) -> ( b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0)
c  in CNF:
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨  b^{93, 11}_2
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨  b^{93, 11}_1
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨  p_930 ∨ -b^{93, 11}_0
c  in DIMACS:
-19127  19128 -19129  930  19130 0
-19127  19128 -19129  930  19131 0
-19127  19128 -19129  930 -19132 0

c  -2-1 --> break 
c    ( b^{93, 10}_2 ∧  b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨  b^{93, 10}_0 ∨  p_930 ∨ break
c  in DIMACS:
-19127 -19128  19129  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 10}_2 ∧ -b^{93, 10}_1 ∧ -b^{93, 10}_0 ∧ true) 
c  in CNF:
c    -b^{93, 10}_2 ∨  b^{93, 10}_1 ∨  b^{93, 10}_0 ∨ false 
c  in DIMACS:
-19127  19128  19129  0

c  3 does not represent an automaton state.
c    -(-b^{93, 10}_2 ∧  b^{93, 10}_1 ∧  b^{93, 10}_0 ∧ true) 
c  in CNF:
c     b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ false 
c  in DIMACS:
 19127 -19128 -19129  0
c  -3 does not represent an automaton state.
c    -( b^{93, 10}_2 ∧  b^{93, 10}_1 ∧  b^{93, 10}_0 ∧ true) 
c  in CNF:
c    -b^{93, 10}_2 ∨ -b^{93, 10}_1 ∨ -b^{93, 10}_0 ∨ false 
c  in DIMACS:
-19127 -19128 -19129  0

c i = 11
c  -2+1 --> -1
c    ( b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧  p_1023) -> ( b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0)
c  in CNF:
c    -b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨  b^{93, 12}_2
c    -b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_1
c    -b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨  b^{93, 12}_0
c  in DIMACS:
-19130 -19131  19132 -1023  19133 0
-19130 -19131  19132 -1023 -19134 0
-19130 -19131  19132 -1023  19135 0

c  -1+1 --> 0
c    ( b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0 ∧  p_1023) -> (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧ -b^{93, 12}_0)
c  in CNF:
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_2
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_1
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_0
c  in DIMACS:
-19130  19131 -19132 -1023 -19133 0
-19130  19131 -19132 -1023 -19134 0
-19130  19131 -19132 -1023 -19135 0

c  0+1 --> 1
c    (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧  p_1023) -> (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0)
c  in CNF:
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_2
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_1
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨  b^{93, 12}_0
c  in DIMACS:
 19130  19131  19132 -1023 -19133 0
 19130  19131  19132 -1023 -19134 0
 19130  19131  19132 -1023  19135 0

c  1+1 --> 2
c    (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0 ∧  p_1023) -> (-b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0)
c  in CNF:
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_2
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨  b^{93, 12}_1
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ -p_1023 ∨ -b^{93, 12}_0
c  in DIMACS:
 19130  19131 -19132 -1023 -19133 0
 19130  19131 -19132 -1023  19134 0
 19130  19131 -19132 -1023 -19135 0

c  2+1 --> break 
c    (-b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 19130 -19131  19132 -1023 1162 0


c  2-1 --> 1
c    (-b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧ -p_1023) -> (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0)
c  in CNF:
c     b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_2
c     b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_1
c     b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨  b^{93, 12}_0
c  in DIMACS:
 19130 -19131  19132  1023 -19133 0
 19130 -19131  19132  1023 -19134 0
 19130 -19131  19132  1023  19135 0

c  1-1 --> 0
c    (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0 ∧ -p_1023) -> (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧ -b^{93, 12}_0)
c  in CNF:
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_2
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_1
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_0
c  in DIMACS:
 19130  19131 -19132  1023 -19133 0
 19130  19131 -19132  1023 -19134 0
 19130  19131 -19132  1023 -19135 0

c  0-1 --> -1
c    (-b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧ -p_1023) -> ( b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0)
c  in CNF:
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨  b^{93, 12}_2
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_1
c     b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨  b^{93, 12}_0
c  in DIMACS:
 19130  19131  19132  1023  19133 0
 19130  19131  19132  1023 -19134 0
 19130  19131  19132  1023  19135 0

c  -1-1 --> -2
c    ( b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧  b^{93, 11}_0 ∧ -p_1023) -> ( b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0)
c  in CNF:
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨  b^{93, 12}_2
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨  b^{93, 12}_1
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨  p_1023 ∨ -b^{93, 12}_0
c  in DIMACS:
-19130  19131 -19132  1023  19133 0
-19130  19131 -19132  1023  19134 0
-19130  19131 -19132  1023 -19135 0

c  -2-1 --> break 
c    ( b^{93, 11}_2 ∧  b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨  b^{93, 11}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-19130 -19131  19132  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 11}_2 ∧ -b^{93, 11}_1 ∧ -b^{93, 11}_0 ∧ true) 
c  in CNF:
c    -b^{93, 11}_2 ∨  b^{93, 11}_1 ∨  b^{93, 11}_0 ∨ false 
c  in DIMACS:
-19130  19131  19132  0

c  3 does not represent an automaton state.
c    -(-b^{93, 11}_2 ∧  b^{93, 11}_1 ∧  b^{93, 11}_0 ∧ true) 
c  in CNF:
c     b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ false 
c  in DIMACS:
 19130 -19131 -19132  0
c  -3 does not represent an automaton state.
c    -( b^{93, 11}_2 ∧  b^{93, 11}_1 ∧  b^{93, 11}_0 ∧ true) 
c  in CNF:
c    -b^{93, 11}_2 ∨ -b^{93, 11}_1 ∨ -b^{93, 11}_0 ∨ false 
c  in DIMACS:
-19130 -19131 -19132  0

c i = 12
c  -2+1 --> -1
c    ( b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧  p_1116) -> ( b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧  b^{93, 13}_0)
c  in CNF:
c    -b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨  b^{93, 13}_2
c    -b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_1
c    -b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨  b^{93, 13}_0
c  in DIMACS:
-19133 -19134  19135 -1116  19136 0
-19133 -19134  19135 -1116 -19137 0
-19133 -19134  19135 -1116  19138 0

c  -1+1 --> 0
c    ( b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0 ∧  p_1116) -> (-b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧ -b^{93, 13}_0)
c  in CNF:
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_2
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_1
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_0
c  in DIMACS:
-19133  19134 -19135 -1116 -19136 0
-19133  19134 -19135 -1116 -19137 0
-19133  19134 -19135 -1116 -19138 0

c  0+1 --> 1
c    (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧  p_1116) -> (-b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧  b^{93, 13}_0)
c  in CNF:
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_2
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_1
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨  b^{93, 13}_0
c  in DIMACS:
 19133  19134  19135 -1116 -19136 0
 19133  19134  19135 -1116 -19137 0
 19133  19134  19135 -1116  19138 0

c  1+1 --> 2
c    (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0 ∧  p_1116) -> (-b^{93, 13}_2 ∧  b^{93, 13}_1 ∧ -b^{93, 13}_0)
c  in CNF:
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_2
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨  b^{93, 13}_1
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ -p_1116 ∨ -b^{93, 13}_0
c  in DIMACS:
 19133  19134 -19135 -1116 -19136 0
 19133  19134 -19135 -1116  19137 0
 19133  19134 -19135 -1116 -19138 0

c  2+1 --> break 
c    (-b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 19133 -19134  19135 -1116 1162 0


c  2-1 --> 1
c    (-b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧ -p_1116) -> (-b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧  b^{93, 13}_0)
c  in CNF:
c     b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_2
c     b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_1
c     b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨  b^{93, 13}_0
c  in DIMACS:
 19133 -19134  19135  1116 -19136 0
 19133 -19134  19135  1116 -19137 0
 19133 -19134  19135  1116  19138 0

c  1-1 --> 0
c    (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0 ∧ -p_1116) -> (-b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧ -b^{93, 13}_0)
c  in CNF:
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_2
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_1
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_0
c  in DIMACS:
 19133  19134 -19135  1116 -19136 0
 19133  19134 -19135  1116 -19137 0
 19133  19134 -19135  1116 -19138 0

c  0-1 --> -1
c    (-b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧ -p_1116) -> ( b^{93, 13}_2 ∧ -b^{93, 13}_1 ∧  b^{93, 13}_0)
c  in CNF:
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨  b^{93, 13}_2
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_1
c     b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨  b^{93, 13}_0
c  in DIMACS:
 19133  19134  19135  1116  19136 0
 19133  19134  19135  1116 -19137 0
 19133  19134  19135  1116  19138 0

c  -1-1 --> -2
c    ( b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧  b^{93, 12}_0 ∧ -p_1116) -> ( b^{93, 13}_2 ∧  b^{93, 13}_1 ∧ -b^{93, 13}_0)
c  in CNF:
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨  b^{93, 13}_2
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨  b^{93, 13}_1
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨  p_1116 ∨ -b^{93, 13}_0
c  in DIMACS:
-19133  19134 -19135  1116  19136 0
-19133  19134 -19135  1116  19137 0
-19133  19134 -19135  1116 -19138 0

c  -2-1 --> break 
c    ( b^{93, 12}_2 ∧  b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨  b^{93, 12}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-19133 -19134  19135  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{93, 12}_2 ∧ -b^{93, 12}_1 ∧ -b^{93, 12}_0 ∧ true) 
c  in CNF:
c    -b^{93, 12}_2 ∨  b^{93, 12}_1 ∨  b^{93, 12}_0 ∨ false 
c  in DIMACS:
-19133  19134  19135  0

c  3 does not represent an automaton state.
c    -(-b^{93, 12}_2 ∧  b^{93, 12}_1 ∧  b^{93, 12}_0 ∧ true) 
c  in CNF:
c     b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ false 
c  in DIMACS:
 19133 -19134 -19135  0
c  -3 does not represent an automaton state.
c    -( b^{93, 12}_2 ∧  b^{93, 12}_1 ∧  b^{93, 12}_0 ∧ true) 
c  in CNF:
c    -b^{93, 12}_2 ∨ -b^{93, 12}_1 ∨ -b^{93, 12}_0 ∨ false 
c  in DIMACS:
-19133 -19134 -19135  0

c INIT for k = 94
c    -b^{94, 1}_2
c    -b^{94, 1}_1
c    -b^{94, 1}_0
c  in DIMACS:
-19139 0
-19140 0
-19141 0

c Transitions for k = 94
c i = 1
c  -2+1 --> -1
c    ( b^{94, 1}_2 ∧  b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧  p_94) -> ( b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0)
c  in CNF:
c    -b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨  b^{94, 2}_2
c    -b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_1
c    -b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨  b^{94, 2}_0
c  in DIMACS:
-19139 -19140  19141 -94  19142 0
-19139 -19140  19141 -94 -19143 0
-19139 -19140  19141 -94  19144 0

c  -1+1 --> 0
c    ( b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧  b^{94, 1}_0 ∧  p_94) -> (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧ -b^{94, 2}_0)
c  in CNF:
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_2
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_1
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_0
c  in DIMACS:
-19139  19140 -19141 -94 -19142 0
-19139  19140 -19141 -94 -19143 0
-19139  19140 -19141 -94 -19144 0

c  0+1 --> 1
c    (-b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧  p_94) -> (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0)
c  in CNF:
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_2
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_1
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨  b^{94, 2}_0
c  in DIMACS:
 19139  19140  19141 -94 -19142 0
 19139  19140  19141 -94 -19143 0
 19139  19140  19141 -94  19144 0

c  1+1 --> 2
c    (-b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧  b^{94, 1}_0 ∧  p_94) -> (-b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0)
c  in CNF:
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_2
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨  b^{94, 2}_1
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ -p_94 ∨ -b^{94, 2}_0
c  in DIMACS:
 19139  19140 -19141 -94 -19142 0
 19139  19140 -19141 -94  19143 0
 19139  19140 -19141 -94 -19144 0

c  2+1 --> break 
c    (-b^{94, 1}_2 ∧  b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧  p_94) -> break
c  in CNF:
c     b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ -p_94 ∨ break
c  in DIMACS:
 19139 -19140  19141 -94 1162 0


c  2-1 --> 1
c    (-b^{94, 1}_2 ∧  b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧ -p_94) -> (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0)
c  in CNF:
c     b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_2
c     b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_1
c     b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨  b^{94, 2}_0
c  in DIMACS:
 19139 -19140  19141  94 -19142 0
 19139 -19140  19141  94 -19143 0
 19139 -19140  19141  94  19144 0

c  1-1 --> 0
c    (-b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧  b^{94, 1}_0 ∧ -p_94) -> (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧ -b^{94, 2}_0)
c  in CNF:
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_2
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_1
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_0
c  in DIMACS:
 19139  19140 -19141  94 -19142 0
 19139  19140 -19141  94 -19143 0
 19139  19140 -19141  94 -19144 0

c  0-1 --> -1
c    (-b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧ -p_94) -> ( b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0)
c  in CNF:
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨  b^{94, 2}_2
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_1
c     b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨  b^{94, 2}_0
c  in DIMACS:
 19139  19140  19141  94  19142 0
 19139  19140  19141  94 -19143 0
 19139  19140  19141  94  19144 0

c  -1-1 --> -2
c    ( b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧  b^{94, 1}_0 ∧ -p_94) -> ( b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0)
c  in CNF:
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨  b^{94, 2}_2
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨  b^{94, 2}_1
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨  p_94 ∨ -b^{94, 2}_0
c  in DIMACS:
-19139  19140 -19141  94  19142 0
-19139  19140 -19141  94  19143 0
-19139  19140 -19141  94 -19144 0

c  -2-1 --> break 
c    ( b^{94, 1}_2 ∧  b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧ -p_94) -> break
c  in CNF:
c    -b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨  b^{94, 1}_0 ∨  p_94 ∨ break
c  in DIMACS:
-19139 -19140  19141  94 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 1}_2 ∧ -b^{94, 1}_1 ∧ -b^{94, 1}_0 ∧ true) 
c  in CNF:
c    -b^{94, 1}_2 ∨  b^{94, 1}_1 ∨  b^{94, 1}_0 ∨ false 
c  in DIMACS:
-19139  19140  19141  0

c  3 does not represent an automaton state.
c    -(-b^{94, 1}_2 ∧  b^{94, 1}_1 ∧  b^{94, 1}_0 ∧ true) 
c  in CNF:
c     b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ false 
c  in DIMACS:
 19139 -19140 -19141  0
c  -3 does not represent an automaton state.
c    -( b^{94, 1}_2 ∧  b^{94, 1}_1 ∧  b^{94, 1}_0 ∧ true) 
c  in CNF:
c    -b^{94, 1}_2 ∨ -b^{94, 1}_1 ∨ -b^{94, 1}_0 ∨ false 
c  in DIMACS:
-19139 -19140 -19141  0

c i = 2
c  -2+1 --> -1
c    ( b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧  p_188) -> ( b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0)
c  in CNF:
c    -b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨  b^{94, 3}_2
c    -b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_1
c    -b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨  b^{94, 3}_0
c  in DIMACS:
-19142 -19143  19144 -188  19145 0
-19142 -19143  19144 -188 -19146 0
-19142 -19143  19144 -188  19147 0

c  -1+1 --> 0
c    ( b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0 ∧  p_188) -> (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧ -b^{94, 3}_0)
c  in CNF:
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_2
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_1
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_0
c  in DIMACS:
-19142  19143 -19144 -188 -19145 0
-19142  19143 -19144 -188 -19146 0
-19142  19143 -19144 -188 -19147 0

c  0+1 --> 1
c    (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧  p_188) -> (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0)
c  in CNF:
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_2
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_1
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨  b^{94, 3}_0
c  in DIMACS:
 19142  19143  19144 -188 -19145 0
 19142  19143  19144 -188 -19146 0
 19142  19143  19144 -188  19147 0

c  1+1 --> 2
c    (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0 ∧  p_188) -> (-b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0)
c  in CNF:
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_2
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨  b^{94, 3}_1
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ -p_188 ∨ -b^{94, 3}_0
c  in DIMACS:
 19142  19143 -19144 -188 -19145 0
 19142  19143 -19144 -188  19146 0
 19142  19143 -19144 -188 -19147 0

c  2+1 --> break 
c    (-b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧  p_188) -> break
c  in CNF:
c     b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 19142 -19143  19144 -188 1162 0


c  2-1 --> 1
c    (-b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧ -p_188) -> (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0)
c  in CNF:
c     b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_2
c     b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_1
c     b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨  b^{94, 3}_0
c  in DIMACS:
 19142 -19143  19144  188 -19145 0
 19142 -19143  19144  188 -19146 0
 19142 -19143  19144  188  19147 0

c  1-1 --> 0
c    (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0 ∧ -p_188) -> (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧ -b^{94, 3}_0)
c  in CNF:
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_2
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_1
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_0
c  in DIMACS:
 19142  19143 -19144  188 -19145 0
 19142  19143 -19144  188 -19146 0
 19142  19143 -19144  188 -19147 0

c  0-1 --> -1
c    (-b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧ -p_188) -> ( b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0)
c  in CNF:
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨  b^{94, 3}_2
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_1
c     b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨  b^{94, 3}_0
c  in DIMACS:
 19142  19143  19144  188  19145 0
 19142  19143  19144  188 -19146 0
 19142  19143  19144  188  19147 0

c  -1-1 --> -2
c    ( b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧  b^{94, 2}_0 ∧ -p_188) -> ( b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0)
c  in CNF:
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨  b^{94, 3}_2
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨  b^{94, 3}_1
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨  p_188 ∨ -b^{94, 3}_0
c  in DIMACS:
-19142  19143 -19144  188  19145 0
-19142  19143 -19144  188  19146 0
-19142  19143 -19144  188 -19147 0

c  -2-1 --> break 
c    ( b^{94, 2}_2 ∧  b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨  b^{94, 2}_0 ∨  p_188 ∨ break
c  in DIMACS:
-19142 -19143  19144  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 2}_2 ∧ -b^{94, 2}_1 ∧ -b^{94, 2}_0 ∧ true) 
c  in CNF:
c    -b^{94, 2}_2 ∨  b^{94, 2}_1 ∨  b^{94, 2}_0 ∨ false 
c  in DIMACS:
-19142  19143  19144  0

c  3 does not represent an automaton state.
c    -(-b^{94, 2}_2 ∧  b^{94, 2}_1 ∧  b^{94, 2}_0 ∧ true) 
c  in CNF:
c     b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ false 
c  in DIMACS:
 19142 -19143 -19144  0
c  -3 does not represent an automaton state.
c    -( b^{94, 2}_2 ∧  b^{94, 2}_1 ∧  b^{94, 2}_0 ∧ true) 
c  in CNF:
c    -b^{94, 2}_2 ∨ -b^{94, 2}_1 ∨ -b^{94, 2}_0 ∨ false 
c  in DIMACS:
-19142 -19143 -19144  0

c i = 3
c  -2+1 --> -1
c    ( b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧  p_282) -> ( b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0)
c  in CNF:
c    -b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨  b^{94, 4}_2
c    -b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_1
c    -b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨  b^{94, 4}_0
c  in DIMACS:
-19145 -19146  19147 -282  19148 0
-19145 -19146  19147 -282 -19149 0
-19145 -19146  19147 -282  19150 0

c  -1+1 --> 0
c    ( b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0 ∧  p_282) -> (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧ -b^{94, 4}_0)
c  in CNF:
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_2
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_1
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_0
c  in DIMACS:
-19145  19146 -19147 -282 -19148 0
-19145  19146 -19147 -282 -19149 0
-19145  19146 -19147 -282 -19150 0

c  0+1 --> 1
c    (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧  p_282) -> (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0)
c  in CNF:
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_2
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_1
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨  b^{94, 4}_0
c  in DIMACS:
 19145  19146  19147 -282 -19148 0
 19145  19146  19147 -282 -19149 0
 19145  19146  19147 -282  19150 0

c  1+1 --> 2
c    (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0 ∧  p_282) -> (-b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0)
c  in CNF:
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_2
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨  b^{94, 4}_1
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ -p_282 ∨ -b^{94, 4}_0
c  in DIMACS:
 19145  19146 -19147 -282 -19148 0
 19145  19146 -19147 -282  19149 0
 19145  19146 -19147 -282 -19150 0

c  2+1 --> break 
c    (-b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧  p_282) -> break
c  in CNF:
c     b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 19145 -19146  19147 -282 1162 0


c  2-1 --> 1
c    (-b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧ -p_282) -> (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0)
c  in CNF:
c     b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_2
c     b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_1
c     b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨  b^{94, 4}_0
c  in DIMACS:
 19145 -19146  19147  282 -19148 0
 19145 -19146  19147  282 -19149 0
 19145 -19146  19147  282  19150 0

c  1-1 --> 0
c    (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0 ∧ -p_282) -> (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧ -b^{94, 4}_0)
c  in CNF:
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_2
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_1
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_0
c  in DIMACS:
 19145  19146 -19147  282 -19148 0
 19145  19146 -19147  282 -19149 0
 19145  19146 -19147  282 -19150 0

c  0-1 --> -1
c    (-b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧ -p_282) -> ( b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0)
c  in CNF:
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨  b^{94, 4}_2
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_1
c     b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨  b^{94, 4}_0
c  in DIMACS:
 19145  19146  19147  282  19148 0
 19145  19146  19147  282 -19149 0
 19145  19146  19147  282  19150 0

c  -1-1 --> -2
c    ( b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧  b^{94, 3}_0 ∧ -p_282) -> ( b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0)
c  in CNF:
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨  b^{94, 4}_2
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨  b^{94, 4}_1
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨  p_282 ∨ -b^{94, 4}_0
c  in DIMACS:
-19145  19146 -19147  282  19148 0
-19145  19146 -19147  282  19149 0
-19145  19146 -19147  282 -19150 0

c  -2-1 --> break 
c    ( b^{94, 3}_2 ∧  b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨  b^{94, 3}_0 ∨  p_282 ∨ break
c  in DIMACS:
-19145 -19146  19147  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 3}_2 ∧ -b^{94, 3}_1 ∧ -b^{94, 3}_0 ∧ true) 
c  in CNF:
c    -b^{94, 3}_2 ∨  b^{94, 3}_1 ∨  b^{94, 3}_0 ∨ false 
c  in DIMACS:
-19145  19146  19147  0

c  3 does not represent an automaton state.
c    -(-b^{94, 3}_2 ∧  b^{94, 3}_1 ∧  b^{94, 3}_0 ∧ true) 
c  in CNF:
c     b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ false 
c  in DIMACS:
 19145 -19146 -19147  0
c  -3 does not represent an automaton state.
c    -( b^{94, 3}_2 ∧  b^{94, 3}_1 ∧  b^{94, 3}_0 ∧ true) 
c  in CNF:
c    -b^{94, 3}_2 ∨ -b^{94, 3}_1 ∨ -b^{94, 3}_0 ∨ false 
c  in DIMACS:
-19145 -19146 -19147  0

c i = 4
c  -2+1 --> -1
c    ( b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧  p_376) -> ( b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0)
c  in CNF:
c    -b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨  b^{94, 5}_2
c    -b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_1
c    -b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨  b^{94, 5}_0
c  in DIMACS:
-19148 -19149  19150 -376  19151 0
-19148 -19149  19150 -376 -19152 0
-19148 -19149  19150 -376  19153 0

c  -1+1 --> 0
c    ( b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0 ∧  p_376) -> (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧ -b^{94, 5}_0)
c  in CNF:
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_2
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_1
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_0
c  in DIMACS:
-19148  19149 -19150 -376 -19151 0
-19148  19149 -19150 -376 -19152 0
-19148  19149 -19150 -376 -19153 0

c  0+1 --> 1
c    (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧  p_376) -> (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0)
c  in CNF:
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_2
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_1
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨  b^{94, 5}_0
c  in DIMACS:
 19148  19149  19150 -376 -19151 0
 19148  19149  19150 -376 -19152 0
 19148  19149  19150 -376  19153 0

c  1+1 --> 2
c    (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0 ∧  p_376) -> (-b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0)
c  in CNF:
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_2
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨  b^{94, 5}_1
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ -p_376 ∨ -b^{94, 5}_0
c  in DIMACS:
 19148  19149 -19150 -376 -19151 0
 19148  19149 -19150 -376  19152 0
 19148  19149 -19150 -376 -19153 0

c  2+1 --> break 
c    (-b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧  p_376) -> break
c  in CNF:
c     b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 19148 -19149  19150 -376 1162 0


c  2-1 --> 1
c    (-b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧ -p_376) -> (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0)
c  in CNF:
c     b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_2
c     b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_1
c     b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨  b^{94, 5}_0
c  in DIMACS:
 19148 -19149  19150  376 -19151 0
 19148 -19149  19150  376 -19152 0
 19148 -19149  19150  376  19153 0

c  1-1 --> 0
c    (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0 ∧ -p_376) -> (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧ -b^{94, 5}_0)
c  in CNF:
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_2
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_1
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_0
c  in DIMACS:
 19148  19149 -19150  376 -19151 0
 19148  19149 -19150  376 -19152 0
 19148  19149 -19150  376 -19153 0

c  0-1 --> -1
c    (-b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧ -p_376) -> ( b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0)
c  in CNF:
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨  b^{94, 5}_2
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_1
c     b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨  b^{94, 5}_0
c  in DIMACS:
 19148  19149  19150  376  19151 0
 19148  19149  19150  376 -19152 0
 19148  19149  19150  376  19153 0

c  -1-1 --> -2
c    ( b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧  b^{94, 4}_0 ∧ -p_376) -> ( b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0)
c  in CNF:
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨  b^{94, 5}_2
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨  b^{94, 5}_1
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨  p_376 ∨ -b^{94, 5}_0
c  in DIMACS:
-19148  19149 -19150  376  19151 0
-19148  19149 -19150  376  19152 0
-19148  19149 -19150  376 -19153 0

c  -2-1 --> break 
c    ( b^{94, 4}_2 ∧  b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨  b^{94, 4}_0 ∨  p_376 ∨ break
c  in DIMACS:
-19148 -19149  19150  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 4}_2 ∧ -b^{94, 4}_1 ∧ -b^{94, 4}_0 ∧ true) 
c  in CNF:
c    -b^{94, 4}_2 ∨  b^{94, 4}_1 ∨  b^{94, 4}_0 ∨ false 
c  in DIMACS:
-19148  19149  19150  0

c  3 does not represent an automaton state.
c    -(-b^{94, 4}_2 ∧  b^{94, 4}_1 ∧  b^{94, 4}_0 ∧ true) 
c  in CNF:
c     b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ false 
c  in DIMACS:
 19148 -19149 -19150  0
c  -3 does not represent an automaton state.
c    -( b^{94, 4}_2 ∧  b^{94, 4}_1 ∧  b^{94, 4}_0 ∧ true) 
c  in CNF:
c    -b^{94, 4}_2 ∨ -b^{94, 4}_1 ∨ -b^{94, 4}_0 ∨ false 
c  in DIMACS:
-19148 -19149 -19150  0

c i = 5
c  -2+1 --> -1
c    ( b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧  p_470) -> ( b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0)
c  in CNF:
c    -b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨  b^{94, 6}_2
c    -b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_1
c    -b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨  b^{94, 6}_0
c  in DIMACS:
-19151 -19152  19153 -470  19154 0
-19151 -19152  19153 -470 -19155 0
-19151 -19152  19153 -470  19156 0

c  -1+1 --> 0
c    ( b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0 ∧  p_470) -> (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧ -b^{94, 6}_0)
c  in CNF:
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_2
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_1
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_0
c  in DIMACS:
-19151  19152 -19153 -470 -19154 0
-19151  19152 -19153 -470 -19155 0
-19151  19152 -19153 -470 -19156 0

c  0+1 --> 1
c    (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧  p_470) -> (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0)
c  in CNF:
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_2
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_1
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨  b^{94, 6}_0
c  in DIMACS:
 19151  19152  19153 -470 -19154 0
 19151  19152  19153 -470 -19155 0
 19151  19152  19153 -470  19156 0

c  1+1 --> 2
c    (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0 ∧  p_470) -> (-b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0)
c  in CNF:
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_2
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨  b^{94, 6}_1
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ -p_470 ∨ -b^{94, 6}_0
c  in DIMACS:
 19151  19152 -19153 -470 -19154 0
 19151  19152 -19153 -470  19155 0
 19151  19152 -19153 -470 -19156 0

c  2+1 --> break 
c    (-b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧  p_470) -> break
c  in CNF:
c     b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 19151 -19152  19153 -470 1162 0


c  2-1 --> 1
c    (-b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧ -p_470) -> (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0)
c  in CNF:
c     b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_2
c     b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_1
c     b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨  b^{94, 6}_0
c  in DIMACS:
 19151 -19152  19153  470 -19154 0
 19151 -19152  19153  470 -19155 0
 19151 -19152  19153  470  19156 0

c  1-1 --> 0
c    (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0 ∧ -p_470) -> (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧ -b^{94, 6}_0)
c  in CNF:
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_2
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_1
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_0
c  in DIMACS:
 19151  19152 -19153  470 -19154 0
 19151  19152 -19153  470 -19155 0
 19151  19152 -19153  470 -19156 0

c  0-1 --> -1
c    (-b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧ -p_470) -> ( b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0)
c  in CNF:
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨  b^{94, 6}_2
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_1
c     b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨  b^{94, 6}_0
c  in DIMACS:
 19151  19152  19153  470  19154 0
 19151  19152  19153  470 -19155 0
 19151  19152  19153  470  19156 0

c  -1-1 --> -2
c    ( b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧  b^{94, 5}_0 ∧ -p_470) -> ( b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0)
c  in CNF:
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨  b^{94, 6}_2
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨  b^{94, 6}_1
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨  p_470 ∨ -b^{94, 6}_0
c  in DIMACS:
-19151  19152 -19153  470  19154 0
-19151  19152 -19153  470  19155 0
-19151  19152 -19153  470 -19156 0

c  -2-1 --> break 
c    ( b^{94, 5}_2 ∧  b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨  b^{94, 5}_0 ∨  p_470 ∨ break
c  in DIMACS:
-19151 -19152  19153  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 5}_2 ∧ -b^{94, 5}_1 ∧ -b^{94, 5}_0 ∧ true) 
c  in CNF:
c    -b^{94, 5}_2 ∨  b^{94, 5}_1 ∨  b^{94, 5}_0 ∨ false 
c  in DIMACS:
-19151  19152  19153  0

c  3 does not represent an automaton state.
c    -(-b^{94, 5}_2 ∧  b^{94, 5}_1 ∧  b^{94, 5}_0 ∧ true) 
c  in CNF:
c     b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ false 
c  in DIMACS:
 19151 -19152 -19153  0
c  -3 does not represent an automaton state.
c    -( b^{94, 5}_2 ∧  b^{94, 5}_1 ∧  b^{94, 5}_0 ∧ true) 
c  in CNF:
c    -b^{94, 5}_2 ∨ -b^{94, 5}_1 ∨ -b^{94, 5}_0 ∨ false 
c  in DIMACS:
-19151 -19152 -19153  0

c i = 6
c  -2+1 --> -1
c    ( b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧  p_564) -> ( b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0)
c  in CNF:
c    -b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨  b^{94, 7}_2
c    -b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_1
c    -b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨  b^{94, 7}_0
c  in DIMACS:
-19154 -19155  19156 -564  19157 0
-19154 -19155  19156 -564 -19158 0
-19154 -19155  19156 -564  19159 0

c  -1+1 --> 0
c    ( b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0 ∧  p_564) -> (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧ -b^{94, 7}_0)
c  in CNF:
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_2
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_1
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_0
c  in DIMACS:
-19154  19155 -19156 -564 -19157 0
-19154  19155 -19156 -564 -19158 0
-19154  19155 -19156 -564 -19159 0

c  0+1 --> 1
c    (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧  p_564) -> (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0)
c  in CNF:
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_2
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_1
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨  b^{94, 7}_0
c  in DIMACS:
 19154  19155  19156 -564 -19157 0
 19154  19155  19156 -564 -19158 0
 19154  19155  19156 -564  19159 0

c  1+1 --> 2
c    (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0 ∧  p_564) -> (-b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0)
c  in CNF:
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_2
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨  b^{94, 7}_1
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ -p_564 ∨ -b^{94, 7}_0
c  in DIMACS:
 19154  19155 -19156 -564 -19157 0
 19154  19155 -19156 -564  19158 0
 19154  19155 -19156 -564 -19159 0

c  2+1 --> break 
c    (-b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧  p_564) -> break
c  in CNF:
c     b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 19154 -19155  19156 -564 1162 0


c  2-1 --> 1
c    (-b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧ -p_564) -> (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0)
c  in CNF:
c     b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_2
c     b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_1
c     b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨  b^{94, 7}_0
c  in DIMACS:
 19154 -19155  19156  564 -19157 0
 19154 -19155  19156  564 -19158 0
 19154 -19155  19156  564  19159 0

c  1-1 --> 0
c    (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0 ∧ -p_564) -> (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧ -b^{94, 7}_0)
c  in CNF:
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_2
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_1
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_0
c  in DIMACS:
 19154  19155 -19156  564 -19157 0
 19154  19155 -19156  564 -19158 0
 19154  19155 -19156  564 -19159 0

c  0-1 --> -1
c    (-b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧ -p_564) -> ( b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0)
c  in CNF:
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨  b^{94, 7}_2
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_1
c     b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨  b^{94, 7}_0
c  in DIMACS:
 19154  19155  19156  564  19157 0
 19154  19155  19156  564 -19158 0
 19154  19155  19156  564  19159 0

c  -1-1 --> -2
c    ( b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧  b^{94, 6}_0 ∧ -p_564) -> ( b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0)
c  in CNF:
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨  b^{94, 7}_2
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨  b^{94, 7}_1
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨  p_564 ∨ -b^{94, 7}_0
c  in DIMACS:
-19154  19155 -19156  564  19157 0
-19154  19155 -19156  564  19158 0
-19154  19155 -19156  564 -19159 0

c  -2-1 --> break 
c    ( b^{94, 6}_2 ∧  b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨  b^{94, 6}_0 ∨  p_564 ∨ break
c  in DIMACS:
-19154 -19155  19156  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 6}_2 ∧ -b^{94, 6}_1 ∧ -b^{94, 6}_0 ∧ true) 
c  in CNF:
c    -b^{94, 6}_2 ∨  b^{94, 6}_1 ∨  b^{94, 6}_0 ∨ false 
c  in DIMACS:
-19154  19155  19156  0

c  3 does not represent an automaton state.
c    -(-b^{94, 6}_2 ∧  b^{94, 6}_1 ∧  b^{94, 6}_0 ∧ true) 
c  in CNF:
c     b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ false 
c  in DIMACS:
 19154 -19155 -19156  0
c  -3 does not represent an automaton state.
c    -( b^{94, 6}_2 ∧  b^{94, 6}_1 ∧  b^{94, 6}_0 ∧ true) 
c  in CNF:
c    -b^{94, 6}_2 ∨ -b^{94, 6}_1 ∨ -b^{94, 6}_0 ∨ false 
c  in DIMACS:
-19154 -19155 -19156  0

c i = 7
c  -2+1 --> -1
c    ( b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧  p_658) -> ( b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0)
c  in CNF:
c    -b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨  b^{94, 8}_2
c    -b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_1
c    -b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨  b^{94, 8}_0
c  in DIMACS:
-19157 -19158  19159 -658  19160 0
-19157 -19158  19159 -658 -19161 0
-19157 -19158  19159 -658  19162 0

c  -1+1 --> 0
c    ( b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0 ∧  p_658) -> (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧ -b^{94, 8}_0)
c  in CNF:
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_2
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_1
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_0
c  in DIMACS:
-19157  19158 -19159 -658 -19160 0
-19157  19158 -19159 -658 -19161 0
-19157  19158 -19159 -658 -19162 0

c  0+1 --> 1
c    (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧  p_658) -> (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0)
c  in CNF:
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_2
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_1
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨  b^{94, 8}_0
c  in DIMACS:
 19157  19158  19159 -658 -19160 0
 19157  19158  19159 -658 -19161 0
 19157  19158  19159 -658  19162 0

c  1+1 --> 2
c    (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0 ∧  p_658) -> (-b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0)
c  in CNF:
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_2
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨  b^{94, 8}_1
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ -p_658 ∨ -b^{94, 8}_0
c  in DIMACS:
 19157  19158 -19159 -658 -19160 0
 19157  19158 -19159 -658  19161 0
 19157  19158 -19159 -658 -19162 0

c  2+1 --> break 
c    (-b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧  p_658) -> break
c  in CNF:
c     b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 19157 -19158  19159 -658 1162 0


c  2-1 --> 1
c    (-b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧ -p_658) -> (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0)
c  in CNF:
c     b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_2
c     b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_1
c     b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨  b^{94, 8}_0
c  in DIMACS:
 19157 -19158  19159  658 -19160 0
 19157 -19158  19159  658 -19161 0
 19157 -19158  19159  658  19162 0

c  1-1 --> 0
c    (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0 ∧ -p_658) -> (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧ -b^{94, 8}_0)
c  in CNF:
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_2
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_1
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_0
c  in DIMACS:
 19157  19158 -19159  658 -19160 0
 19157  19158 -19159  658 -19161 0
 19157  19158 -19159  658 -19162 0

c  0-1 --> -1
c    (-b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧ -p_658) -> ( b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0)
c  in CNF:
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨  b^{94, 8}_2
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_1
c     b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨  b^{94, 8}_0
c  in DIMACS:
 19157  19158  19159  658  19160 0
 19157  19158  19159  658 -19161 0
 19157  19158  19159  658  19162 0

c  -1-1 --> -2
c    ( b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧  b^{94, 7}_0 ∧ -p_658) -> ( b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0)
c  in CNF:
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨  b^{94, 8}_2
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨  b^{94, 8}_1
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨  p_658 ∨ -b^{94, 8}_0
c  in DIMACS:
-19157  19158 -19159  658  19160 0
-19157  19158 -19159  658  19161 0
-19157  19158 -19159  658 -19162 0

c  -2-1 --> break 
c    ( b^{94, 7}_2 ∧  b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨  b^{94, 7}_0 ∨  p_658 ∨ break
c  in DIMACS:
-19157 -19158  19159  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 7}_2 ∧ -b^{94, 7}_1 ∧ -b^{94, 7}_0 ∧ true) 
c  in CNF:
c    -b^{94, 7}_2 ∨  b^{94, 7}_1 ∨  b^{94, 7}_0 ∨ false 
c  in DIMACS:
-19157  19158  19159  0

c  3 does not represent an automaton state.
c    -(-b^{94, 7}_2 ∧  b^{94, 7}_1 ∧  b^{94, 7}_0 ∧ true) 
c  in CNF:
c     b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ false 
c  in DIMACS:
 19157 -19158 -19159  0
c  -3 does not represent an automaton state.
c    -( b^{94, 7}_2 ∧  b^{94, 7}_1 ∧  b^{94, 7}_0 ∧ true) 
c  in CNF:
c    -b^{94, 7}_2 ∨ -b^{94, 7}_1 ∨ -b^{94, 7}_0 ∨ false 
c  in DIMACS:
-19157 -19158 -19159  0

c i = 8
c  -2+1 --> -1
c    ( b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧  p_752) -> ( b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0)
c  in CNF:
c    -b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨  b^{94, 9}_2
c    -b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_1
c    -b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨  b^{94, 9}_0
c  in DIMACS:
-19160 -19161  19162 -752  19163 0
-19160 -19161  19162 -752 -19164 0
-19160 -19161  19162 -752  19165 0

c  -1+1 --> 0
c    ( b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0 ∧  p_752) -> (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧ -b^{94, 9}_0)
c  in CNF:
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_2
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_1
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_0
c  in DIMACS:
-19160  19161 -19162 -752 -19163 0
-19160  19161 -19162 -752 -19164 0
-19160  19161 -19162 -752 -19165 0

c  0+1 --> 1
c    (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧  p_752) -> (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0)
c  in CNF:
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_2
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_1
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨  b^{94, 9}_0
c  in DIMACS:
 19160  19161  19162 -752 -19163 0
 19160  19161  19162 -752 -19164 0
 19160  19161  19162 -752  19165 0

c  1+1 --> 2
c    (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0 ∧  p_752) -> (-b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0)
c  in CNF:
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_2
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨  b^{94, 9}_1
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ -p_752 ∨ -b^{94, 9}_0
c  in DIMACS:
 19160  19161 -19162 -752 -19163 0
 19160  19161 -19162 -752  19164 0
 19160  19161 -19162 -752 -19165 0

c  2+1 --> break 
c    (-b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧  p_752) -> break
c  in CNF:
c     b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 19160 -19161  19162 -752 1162 0


c  2-1 --> 1
c    (-b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧ -p_752) -> (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0)
c  in CNF:
c     b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_2
c     b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_1
c     b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨  b^{94, 9}_0
c  in DIMACS:
 19160 -19161  19162  752 -19163 0
 19160 -19161  19162  752 -19164 0
 19160 -19161  19162  752  19165 0

c  1-1 --> 0
c    (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0 ∧ -p_752) -> (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧ -b^{94, 9}_0)
c  in CNF:
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_2
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_1
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_0
c  in DIMACS:
 19160  19161 -19162  752 -19163 0
 19160  19161 -19162  752 -19164 0
 19160  19161 -19162  752 -19165 0

c  0-1 --> -1
c    (-b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧ -p_752) -> ( b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0)
c  in CNF:
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨  b^{94, 9}_2
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_1
c     b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨  b^{94, 9}_0
c  in DIMACS:
 19160  19161  19162  752  19163 0
 19160  19161  19162  752 -19164 0
 19160  19161  19162  752  19165 0

c  -1-1 --> -2
c    ( b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧  b^{94, 8}_0 ∧ -p_752) -> ( b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0)
c  in CNF:
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨  b^{94, 9}_2
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨  b^{94, 9}_1
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨  p_752 ∨ -b^{94, 9}_0
c  in DIMACS:
-19160  19161 -19162  752  19163 0
-19160  19161 -19162  752  19164 0
-19160  19161 -19162  752 -19165 0

c  -2-1 --> break 
c    ( b^{94, 8}_2 ∧  b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨  b^{94, 8}_0 ∨  p_752 ∨ break
c  in DIMACS:
-19160 -19161  19162  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 8}_2 ∧ -b^{94, 8}_1 ∧ -b^{94, 8}_0 ∧ true) 
c  in CNF:
c    -b^{94, 8}_2 ∨  b^{94, 8}_1 ∨  b^{94, 8}_0 ∨ false 
c  in DIMACS:
-19160  19161  19162  0

c  3 does not represent an automaton state.
c    -(-b^{94, 8}_2 ∧  b^{94, 8}_1 ∧  b^{94, 8}_0 ∧ true) 
c  in CNF:
c     b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ false 
c  in DIMACS:
 19160 -19161 -19162  0
c  -3 does not represent an automaton state.
c    -( b^{94, 8}_2 ∧  b^{94, 8}_1 ∧  b^{94, 8}_0 ∧ true) 
c  in CNF:
c    -b^{94, 8}_2 ∨ -b^{94, 8}_1 ∨ -b^{94, 8}_0 ∨ false 
c  in DIMACS:
-19160 -19161 -19162  0

c i = 9
c  -2+1 --> -1
c    ( b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧  p_846) -> ( b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0)
c  in CNF:
c    -b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨  b^{94, 10}_2
c    -b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_1
c    -b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨  b^{94, 10}_0
c  in DIMACS:
-19163 -19164  19165 -846  19166 0
-19163 -19164  19165 -846 -19167 0
-19163 -19164  19165 -846  19168 0

c  -1+1 --> 0
c    ( b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0 ∧  p_846) -> (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧ -b^{94, 10}_0)
c  in CNF:
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_2
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_1
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_0
c  in DIMACS:
-19163  19164 -19165 -846 -19166 0
-19163  19164 -19165 -846 -19167 0
-19163  19164 -19165 -846 -19168 0

c  0+1 --> 1
c    (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧  p_846) -> (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0)
c  in CNF:
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_2
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_1
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨  b^{94, 10}_0
c  in DIMACS:
 19163  19164  19165 -846 -19166 0
 19163  19164  19165 -846 -19167 0
 19163  19164  19165 -846  19168 0

c  1+1 --> 2
c    (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0 ∧  p_846) -> (-b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0)
c  in CNF:
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_2
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨  b^{94, 10}_1
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ -p_846 ∨ -b^{94, 10}_0
c  in DIMACS:
 19163  19164 -19165 -846 -19166 0
 19163  19164 -19165 -846  19167 0
 19163  19164 -19165 -846 -19168 0

c  2+1 --> break 
c    (-b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧  p_846) -> break
c  in CNF:
c     b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 19163 -19164  19165 -846 1162 0


c  2-1 --> 1
c    (-b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧ -p_846) -> (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0)
c  in CNF:
c     b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_2
c     b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_1
c     b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨  b^{94, 10}_0
c  in DIMACS:
 19163 -19164  19165  846 -19166 0
 19163 -19164  19165  846 -19167 0
 19163 -19164  19165  846  19168 0

c  1-1 --> 0
c    (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0 ∧ -p_846) -> (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧ -b^{94, 10}_0)
c  in CNF:
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_2
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_1
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_0
c  in DIMACS:
 19163  19164 -19165  846 -19166 0
 19163  19164 -19165  846 -19167 0
 19163  19164 -19165  846 -19168 0

c  0-1 --> -1
c    (-b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧ -p_846) -> ( b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0)
c  in CNF:
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨  b^{94, 10}_2
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_1
c     b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨  b^{94, 10}_0
c  in DIMACS:
 19163  19164  19165  846  19166 0
 19163  19164  19165  846 -19167 0
 19163  19164  19165  846  19168 0

c  -1-1 --> -2
c    ( b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧  b^{94, 9}_0 ∧ -p_846) -> ( b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0)
c  in CNF:
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨  b^{94, 10}_2
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨  b^{94, 10}_1
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨  p_846 ∨ -b^{94, 10}_0
c  in DIMACS:
-19163  19164 -19165  846  19166 0
-19163  19164 -19165  846  19167 0
-19163  19164 -19165  846 -19168 0

c  -2-1 --> break 
c    ( b^{94, 9}_2 ∧  b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨  b^{94, 9}_0 ∨  p_846 ∨ break
c  in DIMACS:
-19163 -19164  19165  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 9}_2 ∧ -b^{94, 9}_1 ∧ -b^{94, 9}_0 ∧ true) 
c  in CNF:
c    -b^{94, 9}_2 ∨  b^{94, 9}_1 ∨  b^{94, 9}_0 ∨ false 
c  in DIMACS:
-19163  19164  19165  0

c  3 does not represent an automaton state.
c    -(-b^{94, 9}_2 ∧  b^{94, 9}_1 ∧  b^{94, 9}_0 ∧ true) 
c  in CNF:
c     b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ false 
c  in DIMACS:
 19163 -19164 -19165  0
c  -3 does not represent an automaton state.
c    -( b^{94, 9}_2 ∧  b^{94, 9}_1 ∧  b^{94, 9}_0 ∧ true) 
c  in CNF:
c    -b^{94, 9}_2 ∨ -b^{94, 9}_1 ∨ -b^{94, 9}_0 ∨ false 
c  in DIMACS:
-19163 -19164 -19165  0

c i = 10
c  -2+1 --> -1
c    ( b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧  p_940) -> ( b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0)
c  in CNF:
c    -b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨  b^{94, 11}_2
c    -b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_1
c    -b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨  b^{94, 11}_0
c  in DIMACS:
-19166 -19167  19168 -940  19169 0
-19166 -19167  19168 -940 -19170 0
-19166 -19167  19168 -940  19171 0

c  -1+1 --> 0
c    ( b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0 ∧  p_940) -> (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧ -b^{94, 11}_0)
c  in CNF:
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_2
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_1
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_0
c  in DIMACS:
-19166  19167 -19168 -940 -19169 0
-19166  19167 -19168 -940 -19170 0
-19166  19167 -19168 -940 -19171 0

c  0+1 --> 1
c    (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧  p_940) -> (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0)
c  in CNF:
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_2
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_1
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨  b^{94, 11}_0
c  in DIMACS:
 19166  19167  19168 -940 -19169 0
 19166  19167  19168 -940 -19170 0
 19166  19167  19168 -940  19171 0

c  1+1 --> 2
c    (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0 ∧  p_940) -> (-b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0)
c  in CNF:
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_2
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨  b^{94, 11}_1
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ -p_940 ∨ -b^{94, 11}_0
c  in DIMACS:
 19166  19167 -19168 -940 -19169 0
 19166  19167 -19168 -940  19170 0
 19166  19167 -19168 -940 -19171 0

c  2+1 --> break 
c    (-b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧  p_940) -> break
c  in CNF:
c     b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 19166 -19167  19168 -940 1162 0


c  2-1 --> 1
c    (-b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧ -p_940) -> (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0)
c  in CNF:
c     b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_2
c     b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_1
c     b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨  b^{94, 11}_0
c  in DIMACS:
 19166 -19167  19168  940 -19169 0
 19166 -19167  19168  940 -19170 0
 19166 -19167  19168  940  19171 0

c  1-1 --> 0
c    (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0 ∧ -p_940) -> (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧ -b^{94, 11}_0)
c  in CNF:
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_2
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_1
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_0
c  in DIMACS:
 19166  19167 -19168  940 -19169 0
 19166  19167 -19168  940 -19170 0
 19166  19167 -19168  940 -19171 0

c  0-1 --> -1
c    (-b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧ -p_940) -> ( b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0)
c  in CNF:
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨  b^{94, 11}_2
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_1
c     b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨  b^{94, 11}_0
c  in DIMACS:
 19166  19167  19168  940  19169 0
 19166  19167  19168  940 -19170 0
 19166  19167  19168  940  19171 0

c  -1-1 --> -2
c    ( b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧  b^{94, 10}_0 ∧ -p_940) -> ( b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0)
c  in CNF:
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨  b^{94, 11}_2
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨  b^{94, 11}_1
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨  p_940 ∨ -b^{94, 11}_0
c  in DIMACS:
-19166  19167 -19168  940  19169 0
-19166  19167 -19168  940  19170 0
-19166  19167 -19168  940 -19171 0

c  -2-1 --> break 
c    ( b^{94, 10}_2 ∧  b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨  b^{94, 10}_0 ∨  p_940 ∨ break
c  in DIMACS:
-19166 -19167  19168  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 10}_2 ∧ -b^{94, 10}_1 ∧ -b^{94, 10}_0 ∧ true) 
c  in CNF:
c    -b^{94, 10}_2 ∨  b^{94, 10}_1 ∨  b^{94, 10}_0 ∨ false 
c  in DIMACS:
-19166  19167  19168  0

c  3 does not represent an automaton state.
c    -(-b^{94, 10}_2 ∧  b^{94, 10}_1 ∧  b^{94, 10}_0 ∧ true) 
c  in CNF:
c     b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ false 
c  in DIMACS:
 19166 -19167 -19168  0
c  -3 does not represent an automaton state.
c    -( b^{94, 10}_2 ∧  b^{94, 10}_1 ∧  b^{94, 10}_0 ∧ true) 
c  in CNF:
c    -b^{94, 10}_2 ∨ -b^{94, 10}_1 ∨ -b^{94, 10}_0 ∨ false 
c  in DIMACS:
-19166 -19167 -19168  0

c i = 11
c  -2+1 --> -1
c    ( b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧  p_1034) -> ( b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0)
c  in CNF:
c    -b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨  b^{94, 12}_2
c    -b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_1
c    -b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨  b^{94, 12}_0
c  in DIMACS:
-19169 -19170  19171 -1034  19172 0
-19169 -19170  19171 -1034 -19173 0
-19169 -19170  19171 -1034  19174 0

c  -1+1 --> 0
c    ( b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0 ∧  p_1034) -> (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧ -b^{94, 12}_0)
c  in CNF:
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_2
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_1
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_0
c  in DIMACS:
-19169  19170 -19171 -1034 -19172 0
-19169  19170 -19171 -1034 -19173 0
-19169  19170 -19171 -1034 -19174 0

c  0+1 --> 1
c    (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧  p_1034) -> (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0)
c  in CNF:
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_2
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_1
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨  b^{94, 12}_0
c  in DIMACS:
 19169  19170  19171 -1034 -19172 0
 19169  19170  19171 -1034 -19173 0
 19169  19170  19171 -1034  19174 0

c  1+1 --> 2
c    (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0 ∧  p_1034) -> (-b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0)
c  in CNF:
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_2
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨  b^{94, 12}_1
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ -p_1034 ∨ -b^{94, 12}_0
c  in DIMACS:
 19169  19170 -19171 -1034 -19172 0
 19169  19170 -19171 -1034  19173 0
 19169  19170 -19171 -1034 -19174 0

c  2+1 --> break 
c    (-b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧  p_1034) -> break
c  in CNF:
c     b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ -p_1034 ∨ break
c  in DIMACS:
 19169 -19170  19171 -1034 1162 0


c  2-1 --> 1
c    (-b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧ -p_1034) -> (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0)
c  in CNF:
c     b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_2
c     b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_1
c     b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨  b^{94, 12}_0
c  in DIMACS:
 19169 -19170  19171  1034 -19172 0
 19169 -19170  19171  1034 -19173 0
 19169 -19170  19171  1034  19174 0

c  1-1 --> 0
c    (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0 ∧ -p_1034) -> (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧ -b^{94, 12}_0)
c  in CNF:
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_2
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_1
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_0
c  in DIMACS:
 19169  19170 -19171  1034 -19172 0
 19169  19170 -19171  1034 -19173 0
 19169  19170 -19171  1034 -19174 0

c  0-1 --> -1
c    (-b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧ -p_1034) -> ( b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0)
c  in CNF:
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨  b^{94, 12}_2
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_1
c     b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨  b^{94, 12}_0
c  in DIMACS:
 19169  19170  19171  1034  19172 0
 19169  19170  19171  1034 -19173 0
 19169  19170  19171  1034  19174 0

c  -1-1 --> -2
c    ( b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧  b^{94, 11}_0 ∧ -p_1034) -> ( b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0)
c  in CNF:
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨  b^{94, 12}_2
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨  b^{94, 12}_1
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨  p_1034 ∨ -b^{94, 12}_0
c  in DIMACS:
-19169  19170 -19171  1034  19172 0
-19169  19170 -19171  1034  19173 0
-19169  19170 -19171  1034 -19174 0

c  -2-1 --> break 
c    ( b^{94, 11}_2 ∧  b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧ -p_1034) -> break
c  in CNF:
c    -b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨  b^{94, 11}_0 ∨  p_1034 ∨ break
c  in DIMACS:
-19169 -19170  19171  1034 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 11}_2 ∧ -b^{94, 11}_1 ∧ -b^{94, 11}_0 ∧ true) 
c  in CNF:
c    -b^{94, 11}_2 ∨  b^{94, 11}_1 ∨  b^{94, 11}_0 ∨ false 
c  in DIMACS:
-19169  19170  19171  0

c  3 does not represent an automaton state.
c    -(-b^{94, 11}_2 ∧  b^{94, 11}_1 ∧  b^{94, 11}_0 ∧ true) 
c  in CNF:
c     b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ false 
c  in DIMACS:
 19169 -19170 -19171  0
c  -3 does not represent an automaton state.
c    -( b^{94, 11}_2 ∧  b^{94, 11}_1 ∧  b^{94, 11}_0 ∧ true) 
c  in CNF:
c    -b^{94, 11}_2 ∨ -b^{94, 11}_1 ∨ -b^{94, 11}_0 ∨ false 
c  in DIMACS:
-19169 -19170 -19171  0

c i = 12
c  -2+1 --> -1
c    ( b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧  p_1128) -> ( b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧  b^{94, 13}_0)
c  in CNF:
c    -b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨  b^{94, 13}_2
c    -b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_1
c    -b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨  b^{94, 13}_0
c  in DIMACS:
-19172 -19173  19174 -1128  19175 0
-19172 -19173  19174 -1128 -19176 0
-19172 -19173  19174 -1128  19177 0

c  -1+1 --> 0
c    ( b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0 ∧  p_1128) -> (-b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧ -b^{94, 13}_0)
c  in CNF:
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_2
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_1
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_0
c  in DIMACS:
-19172  19173 -19174 -1128 -19175 0
-19172  19173 -19174 -1128 -19176 0
-19172  19173 -19174 -1128 -19177 0

c  0+1 --> 1
c    (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧  p_1128) -> (-b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧  b^{94, 13}_0)
c  in CNF:
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_2
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_1
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨  b^{94, 13}_0
c  in DIMACS:
 19172  19173  19174 -1128 -19175 0
 19172  19173  19174 -1128 -19176 0
 19172  19173  19174 -1128  19177 0

c  1+1 --> 2
c    (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0 ∧  p_1128) -> (-b^{94, 13}_2 ∧  b^{94, 13}_1 ∧ -b^{94, 13}_0)
c  in CNF:
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_2
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨  b^{94, 13}_1
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ -p_1128 ∨ -b^{94, 13}_0
c  in DIMACS:
 19172  19173 -19174 -1128 -19175 0
 19172  19173 -19174 -1128  19176 0
 19172  19173 -19174 -1128 -19177 0

c  2+1 --> break 
c    (-b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 19172 -19173  19174 -1128 1162 0


c  2-1 --> 1
c    (-b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧ -p_1128) -> (-b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧  b^{94, 13}_0)
c  in CNF:
c     b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_2
c     b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_1
c     b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨  b^{94, 13}_0
c  in DIMACS:
 19172 -19173  19174  1128 -19175 0
 19172 -19173  19174  1128 -19176 0
 19172 -19173  19174  1128  19177 0

c  1-1 --> 0
c    (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0 ∧ -p_1128) -> (-b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧ -b^{94, 13}_0)
c  in CNF:
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_2
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_1
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_0
c  in DIMACS:
 19172  19173 -19174  1128 -19175 0
 19172  19173 -19174  1128 -19176 0
 19172  19173 -19174  1128 -19177 0

c  0-1 --> -1
c    (-b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧ -p_1128) -> ( b^{94, 13}_2 ∧ -b^{94, 13}_1 ∧  b^{94, 13}_0)
c  in CNF:
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨  b^{94, 13}_2
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_1
c     b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨  b^{94, 13}_0
c  in DIMACS:
 19172  19173  19174  1128  19175 0
 19172  19173  19174  1128 -19176 0
 19172  19173  19174  1128  19177 0

c  -1-1 --> -2
c    ( b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧  b^{94, 12}_0 ∧ -p_1128) -> ( b^{94, 13}_2 ∧  b^{94, 13}_1 ∧ -b^{94, 13}_0)
c  in CNF:
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨  b^{94, 13}_2
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨  b^{94, 13}_1
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨  p_1128 ∨ -b^{94, 13}_0
c  in DIMACS:
-19172  19173 -19174  1128  19175 0
-19172  19173 -19174  1128  19176 0
-19172  19173 -19174  1128 -19177 0

c  -2-1 --> break 
c    ( b^{94, 12}_2 ∧  b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨  b^{94, 12}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-19172 -19173  19174  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{94, 12}_2 ∧ -b^{94, 12}_1 ∧ -b^{94, 12}_0 ∧ true) 
c  in CNF:
c    -b^{94, 12}_2 ∨  b^{94, 12}_1 ∨  b^{94, 12}_0 ∨ false 
c  in DIMACS:
-19172  19173  19174  0

c  3 does not represent an automaton state.
c    -(-b^{94, 12}_2 ∧  b^{94, 12}_1 ∧  b^{94, 12}_0 ∧ true) 
c  in CNF:
c     b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ false 
c  in DIMACS:
 19172 -19173 -19174  0
c  -3 does not represent an automaton state.
c    -( b^{94, 12}_2 ∧  b^{94, 12}_1 ∧  b^{94, 12}_0 ∧ true) 
c  in CNF:
c    -b^{94, 12}_2 ∨ -b^{94, 12}_1 ∨ -b^{94, 12}_0 ∨ false 
c  in DIMACS:
-19172 -19173 -19174  0

c INIT for k = 95
c    -b^{95, 1}_2
c    -b^{95, 1}_1
c    -b^{95, 1}_0
c  in DIMACS:
-19178 0
-19179 0
-19180 0

c Transitions for k = 95
c i = 1
c  -2+1 --> -1
c    ( b^{95, 1}_2 ∧  b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧  p_95) -> ( b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0)
c  in CNF:
c    -b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨  b^{95, 2}_2
c    -b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_1
c    -b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨  b^{95, 2}_0
c  in DIMACS:
-19178 -19179  19180 -95  19181 0
-19178 -19179  19180 -95 -19182 0
-19178 -19179  19180 -95  19183 0

c  -1+1 --> 0
c    ( b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧  b^{95, 1}_0 ∧  p_95) -> (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧ -b^{95, 2}_0)
c  in CNF:
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_2
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_1
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_0
c  in DIMACS:
-19178  19179 -19180 -95 -19181 0
-19178  19179 -19180 -95 -19182 0
-19178  19179 -19180 -95 -19183 0

c  0+1 --> 1
c    (-b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧  p_95) -> (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0)
c  in CNF:
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_2
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_1
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨  b^{95, 2}_0
c  in DIMACS:
 19178  19179  19180 -95 -19181 0
 19178  19179  19180 -95 -19182 0
 19178  19179  19180 -95  19183 0

c  1+1 --> 2
c    (-b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧  b^{95, 1}_0 ∧  p_95) -> (-b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0)
c  in CNF:
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_2
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨  b^{95, 2}_1
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ -p_95 ∨ -b^{95, 2}_0
c  in DIMACS:
 19178  19179 -19180 -95 -19181 0
 19178  19179 -19180 -95  19182 0
 19178  19179 -19180 -95 -19183 0

c  2+1 --> break 
c    (-b^{95, 1}_2 ∧  b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧  p_95) -> break
c  in CNF:
c     b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ -p_95 ∨ break
c  in DIMACS:
 19178 -19179  19180 -95 1162 0


c  2-1 --> 1
c    (-b^{95, 1}_2 ∧  b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧ -p_95) -> (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0)
c  in CNF:
c     b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_2
c     b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_1
c     b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨  b^{95, 2}_0
c  in DIMACS:
 19178 -19179  19180  95 -19181 0
 19178 -19179  19180  95 -19182 0
 19178 -19179  19180  95  19183 0

c  1-1 --> 0
c    (-b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧  b^{95, 1}_0 ∧ -p_95) -> (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧ -b^{95, 2}_0)
c  in CNF:
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_2
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_1
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_0
c  in DIMACS:
 19178  19179 -19180  95 -19181 0
 19178  19179 -19180  95 -19182 0
 19178  19179 -19180  95 -19183 0

c  0-1 --> -1
c    (-b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧ -p_95) -> ( b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0)
c  in CNF:
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨  b^{95, 2}_2
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_1
c     b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨  b^{95, 2}_0
c  in DIMACS:
 19178  19179  19180  95  19181 0
 19178  19179  19180  95 -19182 0
 19178  19179  19180  95  19183 0

c  -1-1 --> -2
c    ( b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧  b^{95, 1}_0 ∧ -p_95) -> ( b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0)
c  in CNF:
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨  b^{95, 2}_2
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨  b^{95, 2}_1
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨  p_95 ∨ -b^{95, 2}_0
c  in DIMACS:
-19178  19179 -19180  95  19181 0
-19178  19179 -19180  95  19182 0
-19178  19179 -19180  95 -19183 0

c  -2-1 --> break 
c    ( b^{95, 1}_2 ∧  b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧ -p_95) -> break
c  in CNF:
c    -b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨  b^{95, 1}_0 ∨  p_95 ∨ break
c  in DIMACS:
-19178 -19179  19180  95 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 1}_2 ∧ -b^{95, 1}_1 ∧ -b^{95, 1}_0 ∧ true) 
c  in CNF:
c    -b^{95, 1}_2 ∨  b^{95, 1}_1 ∨  b^{95, 1}_0 ∨ false 
c  in DIMACS:
-19178  19179  19180  0

c  3 does not represent an automaton state.
c    -(-b^{95, 1}_2 ∧  b^{95, 1}_1 ∧  b^{95, 1}_0 ∧ true) 
c  in CNF:
c     b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ false 
c  in DIMACS:
 19178 -19179 -19180  0
c  -3 does not represent an automaton state.
c    -( b^{95, 1}_2 ∧  b^{95, 1}_1 ∧  b^{95, 1}_0 ∧ true) 
c  in CNF:
c    -b^{95, 1}_2 ∨ -b^{95, 1}_1 ∨ -b^{95, 1}_0 ∨ false 
c  in DIMACS:
-19178 -19179 -19180  0

c i = 2
c  -2+1 --> -1
c    ( b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧  p_190) -> ( b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0)
c  in CNF:
c    -b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨  b^{95, 3}_2
c    -b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_1
c    -b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨  b^{95, 3}_0
c  in DIMACS:
-19181 -19182  19183 -190  19184 0
-19181 -19182  19183 -190 -19185 0
-19181 -19182  19183 -190  19186 0

c  -1+1 --> 0
c    ( b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0 ∧  p_190) -> (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧ -b^{95, 3}_0)
c  in CNF:
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_2
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_1
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_0
c  in DIMACS:
-19181  19182 -19183 -190 -19184 0
-19181  19182 -19183 -190 -19185 0
-19181  19182 -19183 -190 -19186 0

c  0+1 --> 1
c    (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧  p_190) -> (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0)
c  in CNF:
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_2
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_1
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨  b^{95, 3}_0
c  in DIMACS:
 19181  19182  19183 -190 -19184 0
 19181  19182  19183 -190 -19185 0
 19181  19182  19183 -190  19186 0

c  1+1 --> 2
c    (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0 ∧  p_190) -> (-b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0)
c  in CNF:
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_2
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨  b^{95, 3}_1
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ -p_190 ∨ -b^{95, 3}_0
c  in DIMACS:
 19181  19182 -19183 -190 -19184 0
 19181  19182 -19183 -190  19185 0
 19181  19182 -19183 -190 -19186 0

c  2+1 --> break 
c    (-b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧  p_190) -> break
c  in CNF:
c     b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 19181 -19182  19183 -190 1162 0


c  2-1 --> 1
c    (-b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧ -p_190) -> (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0)
c  in CNF:
c     b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_2
c     b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_1
c     b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨  b^{95, 3}_0
c  in DIMACS:
 19181 -19182  19183  190 -19184 0
 19181 -19182  19183  190 -19185 0
 19181 -19182  19183  190  19186 0

c  1-1 --> 0
c    (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0 ∧ -p_190) -> (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧ -b^{95, 3}_0)
c  in CNF:
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_2
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_1
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_0
c  in DIMACS:
 19181  19182 -19183  190 -19184 0
 19181  19182 -19183  190 -19185 0
 19181  19182 -19183  190 -19186 0

c  0-1 --> -1
c    (-b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧ -p_190) -> ( b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0)
c  in CNF:
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨  b^{95, 3}_2
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_1
c     b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨  b^{95, 3}_0
c  in DIMACS:
 19181  19182  19183  190  19184 0
 19181  19182  19183  190 -19185 0
 19181  19182  19183  190  19186 0

c  -1-1 --> -2
c    ( b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧  b^{95, 2}_0 ∧ -p_190) -> ( b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0)
c  in CNF:
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨  b^{95, 3}_2
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨  b^{95, 3}_1
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨  p_190 ∨ -b^{95, 3}_0
c  in DIMACS:
-19181  19182 -19183  190  19184 0
-19181  19182 -19183  190  19185 0
-19181  19182 -19183  190 -19186 0

c  -2-1 --> break 
c    ( b^{95, 2}_2 ∧  b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨  b^{95, 2}_0 ∨  p_190 ∨ break
c  in DIMACS:
-19181 -19182  19183  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 2}_2 ∧ -b^{95, 2}_1 ∧ -b^{95, 2}_0 ∧ true) 
c  in CNF:
c    -b^{95, 2}_2 ∨  b^{95, 2}_1 ∨  b^{95, 2}_0 ∨ false 
c  in DIMACS:
-19181  19182  19183  0

c  3 does not represent an automaton state.
c    -(-b^{95, 2}_2 ∧  b^{95, 2}_1 ∧  b^{95, 2}_0 ∧ true) 
c  in CNF:
c     b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ false 
c  in DIMACS:
 19181 -19182 -19183  0
c  -3 does not represent an automaton state.
c    -( b^{95, 2}_2 ∧  b^{95, 2}_1 ∧  b^{95, 2}_0 ∧ true) 
c  in CNF:
c    -b^{95, 2}_2 ∨ -b^{95, 2}_1 ∨ -b^{95, 2}_0 ∨ false 
c  in DIMACS:
-19181 -19182 -19183  0

c i = 3
c  -2+1 --> -1
c    ( b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧  p_285) -> ( b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0)
c  in CNF:
c    -b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨  b^{95, 4}_2
c    -b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_1
c    -b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨  b^{95, 4}_0
c  in DIMACS:
-19184 -19185  19186 -285  19187 0
-19184 -19185  19186 -285 -19188 0
-19184 -19185  19186 -285  19189 0

c  -1+1 --> 0
c    ( b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0 ∧  p_285) -> (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧ -b^{95, 4}_0)
c  in CNF:
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_2
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_1
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_0
c  in DIMACS:
-19184  19185 -19186 -285 -19187 0
-19184  19185 -19186 -285 -19188 0
-19184  19185 -19186 -285 -19189 0

c  0+1 --> 1
c    (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧  p_285) -> (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0)
c  in CNF:
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_2
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_1
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨  b^{95, 4}_0
c  in DIMACS:
 19184  19185  19186 -285 -19187 0
 19184  19185  19186 -285 -19188 0
 19184  19185  19186 -285  19189 0

c  1+1 --> 2
c    (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0 ∧  p_285) -> (-b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0)
c  in CNF:
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_2
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨  b^{95, 4}_1
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ -p_285 ∨ -b^{95, 4}_0
c  in DIMACS:
 19184  19185 -19186 -285 -19187 0
 19184  19185 -19186 -285  19188 0
 19184  19185 -19186 -285 -19189 0

c  2+1 --> break 
c    (-b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧  p_285) -> break
c  in CNF:
c     b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 19184 -19185  19186 -285 1162 0


c  2-1 --> 1
c    (-b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧ -p_285) -> (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0)
c  in CNF:
c     b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_2
c     b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_1
c     b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨  b^{95, 4}_0
c  in DIMACS:
 19184 -19185  19186  285 -19187 0
 19184 -19185  19186  285 -19188 0
 19184 -19185  19186  285  19189 0

c  1-1 --> 0
c    (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0 ∧ -p_285) -> (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧ -b^{95, 4}_0)
c  in CNF:
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_2
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_1
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_0
c  in DIMACS:
 19184  19185 -19186  285 -19187 0
 19184  19185 -19186  285 -19188 0
 19184  19185 -19186  285 -19189 0

c  0-1 --> -1
c    (-b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧ -p_285) -> ( b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0)
c  in CNF:
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨  b^{95, 4}_2
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_1
c     b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨  b^{95, 4}_0
c  in DIMACS:
 19184  19185  19186  285  19187 0
 19184  19185  19186  285 -19188 0
 19184  19185  19186  285  19189 0

c  -1-1 --> -2
c    ( b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧  b^{95, 3}_0 ∧ -p_285) -> ( b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0)
c  in CNF:
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨  b^{95, 4}_2
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨  b^{95, 4}_1
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨  p_285 ∨ -b^{95, 4}_0
c  in DIMACS:
-19184  19185 -19186  285  19187 0
-19184  19185 -19186  285  19188 0
-19184  19185 -19186  285 -19189 0

c  -2-1 --> break 
c    ( b^{95, 3}_2 ∧  b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨  b^{95, 3}_0 ∨  p_285 ∨ break
c  in DIMACS:
-19184 -19185  19186  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 3}_2 ∧ -b^{95, 3}_1 ∧ -b^{95, 3}_0 ∧ true) 
c  in CNF:
c    -b^{95, 3}_2 ∨  b^{95, 3}_1 ∨  b^{95, 3}_0 ∨ false 
c  in DIMACS:
-19184  19185  19186  0

c  3 does not represent an automaton state.
c    -(-b^{95, 3}_2 ∧  b^{95, 3}_1 ∧  b^{95, 3}_0 ∧ true) 
c  in CNF:
c     b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ false 
c  in DIMACS:
 19184 -19185 -19186  0
c  -3 does not represent an automaton state.
c    -( b^{95, 3}_2 ∧  b^{95, 3}_1 ∧  b^{95, 3}_0 ∧ true) 
c  in CNF:
c    -b^{95, 3}_2 ∨ -b^{95, 3}_1 ∨ -b^{95, 3}_0 ∨ false 
c  in DIMACS:
-19184 -19185 -19186  0

c i = 4
c  -2+1 --> -1
c    ( b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧  p_380) -> ( b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0)
c  in CNF:
c    -b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨  b^{95, 5}_2
c    -b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_1
c    -b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨  b^{95, 5}_0
c  in DIMACS:
-19187 -19188  19189 -380  19190 0
-19187 -19188  19189 -380 -19191 0
-19187 -19188  19189 -380  19192 0

c  -1+1 --> 0
c    ( b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0 ∧  p_380) -> (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧ -b^{95, 5}_0)
c  in CNF:
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_2
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_1
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_0
c  in DIMACS:
-19187  19188 -19189 -380 -19190 0
-19187  19188 -19189 -380 -19191 0
-19187  19188 -19189 -380 -19192 0

c  0+1 --> 1
c    (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧  p_380) -> (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0)
c  in CNF:
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_2
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_1
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨  b^{95, 5}_0
c  in DIMACS:
 19187  19188  19189 -380 -19190 0
 19187  19188  19189 -380 -19191 0
 19187  19188  19189 -380  19192 0

c  1+1 --> 2
c    (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0 ∧  p_380) -> (-b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0)
c  in CNF:
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_2
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨  b^{95, 5}_1
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ -p_380 ∨ -b^{95, 5}_0
c  in DIMACS:
 19187  19188 -19189 -380 -19190 0
 19187  19188 -19189 -380  19191 0
 19187  19188 -19189 -380 -19192 0

c  2+1 --> break 
c    (-b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧  p_380) -> break
c  in CNF:
c     b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 19187 -19188  19189 -380 1162 0


c  2-1 --> 1
c    (-b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧ -p_380) -> (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0)
c  in CNF:
c     b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_2
c     b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_1
c     b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨  b^{95, 5}_0
c  in DIMACS:
 19187 -19188  19189  380 -19190 0
 19187 -19188  19189  380 -19191 0
 19187 -19188  19189  380  19192 0

c  1-1 --> 0
c    (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0 ∧ -p_380) -> (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧ -b^{95, 5}_0)
c  in CNF:
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_2
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_1
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_0
c  in DIMACS:
 19187  19188 -19189  380 -19190 0
 19187  19188 -19189  380 -19191 0
 19187  19188 -19189  380 -19192 0

c  0-1 --> -1
c    (-b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧ -p_380) -> ( b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0)
c  in CNF:
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨  b^{95, 5}_2
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_1
c     b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨  b^{95, 5}_0
c  in DIMACS:
 19187  19188  19189  380  19190 0
 19187  19188  19189  380 -19191 0
 19187  19188  19189  380  19192 0

c  -1-1 --> -2
c    ( b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧  b^{95, 4}_0 ∧ -p_380) -> ( b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0)
c  in CNF:
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨  b^{95, 5}_2
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨  b^{95, 5}_1
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨  p_380 ∨ -b^{95, 5}_0
c  in DIMACS:
-19187  19188 -19189  380  19190 0
-19187  19188 -19189  380  19191 0
-19187  19188 -19189  380 -19192 0

c  -2-1 --> break 
c    ( b^{95, 4}_2 ∧  b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨  b^{95, 4}_0 ∨  p_380 ∨ break
c  in DIMACS:
-19187 -19188  19189  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 4}_2 ∧ -b^{95, 4}_1 ∧ -b^{95, 4}_0 ∧ true) 
c  in CNF:
c    -b^{95, 4}_2 ∨  b^{95, 4}_1 ∨  b^{95, 4}_0 ∨ false 
c  in DIMACS:
-19187  19188  19189  0

c  3 does not represent an automaton state.
c    -(-b^{95, 4}_2 ∧  b^{95, 4}_1 ∧  b^{95, 4}_0 ∧ true) 
c  in CNF:
c     b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ false 
c  in DIMACS:
 19187 -19188 -19189  0
c  -3 does not represent an automaton state.
c    -( b^{95, 4}_2 ∧  b^{95, 4}_1 ∧  b^{95, 4}_0 ∧ true) 
c  in CNF:
c    -b^{95, 4}_2 ∨ -b^{95, 4}_1 ∨ -b^{95, 4}_0 ∨ false 
c  in DIMACS:
-19187 -19188 -19189  0

c i = 5
c  -2+1 --> -1
c    ( b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧  p_475) -> ( b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0)
c  in CNF:
c    -b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨  b^{95, 6}_2
c    -b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_1
c    -b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨  b^{95, 6}_0
c  in DIMACS:
-19190 -19191  19192 -475  19193 0
-19190 -19191  19192 -475 -19194 0
-19190 -19191  19192 -475  19195 0

c  -1+1 --> 0
c    ( b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0 ∧  p_475) -> (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧ -b^{95, 6}_0)
c  in CNF:
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_2
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_1
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_0
c  in DIMACS:
-19190  19191 -19192 -475 -19193 0
-19190  19191 -19192 -475 -19194 0
-19190  19191 -19192 -475 -19195 0

c  0+1 --> 1
c    (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧  p_475) -> (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0)
c  in CNF:
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_2
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_1
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨  b^{95, 6}_0
c  in DIMACS:
 19190  19191  19192 -475 -19193 0
 19190  19191  19192 -475 -19194 0
 19190  19191  19192 -475  19195 0

c  1+1 --> 2
c    (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0 ∧  p_475) -> (-b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0)
c  in CNF:
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_2
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨  b^{95, 6}_1
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ -p_475 ∨ -b^{95, 6}_0
c  in DIMACS:
 19190  19191 -19192 -475 -19193 0
 19190  19191 -19192 -475  19194 0
 19190  19191 -19192 -475 -19195 0

c  2+1 --> break 
c    (-b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧  p_475) -> break
c  in CNF:
c     b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ -p_475 ∨ break
c  in DIMACS:
 19190 -19191  19192 -475 1162 0


c  2-1 --> 1
c    (-b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧ -p_475) -> (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0)
c  in CNF:
c     b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_2
c     b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_1
c     b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨  b^{95, 6}_0
c  in DIMACS:
 19190 -19191  19192  475 -19193 0
 19190 -19191  19192  475 -19194 0
 19190 -19191  19192  475  19195 0

c  1-1 --> 0
c    (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0 ∧ -p_475) -> (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧ -b^{95, 6}_0)
c  in CNF:
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_2
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_1
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_0
c  in DIMACS:
 19190  19191 -19192  475 -19193 0
 19190  19191 -19192  475 -19194 0
 19190  19191 -19192  475 -19195 0

c  0-1 --> -1
c    (-b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧ -p_475) -> ( b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0)
c  in CNF:
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨  b^{95, 6}_2
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_1
c     b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨  b^{95, 6}_0
c  in DIMACS:
 19190  19191  19192  475  19193 0
 19190  19191  19192  475 -19194 0
 19190  19191  19192  475  19195 0

c  -1-1 --> -2
c    ( b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧  b^{95, 5}_0 ∧ -p_475) -> ( b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0)
c  in CNF:
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨  b^{95, 6}_2
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨  b^{95, 6}_1
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨  p_475 ∨ -b^{95, 6}_0
c  in DIMACS:
-19190  19191 -19192  475  19193 0
-19190  19191 -19192  475  19194 0
-19190  19191 -19192  475 -19195 0

c  -2-1 --> break 
c    ( b^{95, 5}_2 ∧  b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧ -p_475) -> break
c  in CNF:
c    -b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨  b^{95, 5}_0 ∨  p_475 ∨ break
c  in DIMACS:
-19190 -19191  19192  475 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 5}_2 ∧ -b^{95, 5}_1 ∧ -b^{95, 5}_0 ∧ true) 
c  in CNF:
c    -b^{95, 5}_2 ∨  b^{95, 5}_1 ∨  b^{95, 5}_0 ∨ false 
c  in DIMACS:
-19190  19191  19192  0

c  3 does not represent an automaton state.
c    -(-b^{95, 5}_2 ∧  b^{95, 5}_1 ∧  b^{95, 5}_0 ∧ true) 
c  in CNF:
c     b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ false 
c  in DIMACS:
 19190 -19191 -19192  0
c  -3 does not represent an automaton state.
c    -( b^{95, 5}_2 ∧  b^{95, 5}_1 ∧  b^{95, 5}_0 ∧ true) 
c  in CNF:
c    -b^{95, 5}_2 ∨ -b^{95, 5}_1 ∨ -b^{95, 5}_0 ∨ false 
c  in DIMACS:
-19190 -19191 -19192  0

c i = 6
c  -2+1 --> -1
c    ( b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧  p_570) -> ( b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0)
c  in CNF:
c    -b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨  b^{95, 7}_2
c    -b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_1
c    -b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨  b^{95, 7}_0
c  in DIMACS:
-19193 -19194  19195 -570  19196 0
-19193 -19194  19195 -570 -19197 0
-19193 -19194  19195 -570  19198 0

c  -1+1 --> 0
c    ( b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0 ∧  p_570) -> (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧ -b^{95, 7}_0)
c  in CNF:
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_2
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_1
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_0
c  in DIMACS:
-19193  19194 -19195 -570 -19196 0
-19193  19194 -19195 -570 -19197 0
-19193  19194 -19195 -570 -19198 0

c  0+1 --> 1
c    (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧  p_570) -> (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0)
c  in CNF:
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_2
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_1
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨  b^{95, 7}_0
c  in DIMACS:
 19193  19194  19195 -570 -19196 0
 19193  19194  19195 -570 -19197 0
 19193  19194  19195 -570  19198 0

c  1+1 --> 2
c    (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0 ∧  p_570) -> (-b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0)
c  in CNF:
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_2
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨  b^{95, 7}_1
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ -p_570 ∨ -b^{95, 7}_0
c  in DIMACS:
 19193  19194 -19195 -570 -19196 0
 19193  19194 -19195 -570  19197 0
 19193  19194 -19195 -570 -19198 0

c  2+1 --> break 
c    (-b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧  p_570) -> break
c  in CNF:
c     b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 19193 -19194  19195 -570 1162 0


c  2-1 --> 1
c    (-b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧ -p_570) -> (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0)
c  in CNF:
c     b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_2
c     b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_1
c     b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨  b^{95, 7}_0
c  in DIMACS:
 19193 -19194  19195  570 -19196 0
 19193 -19194  19195  570 -19197 0
 19193 -19194  19195  570  19198 0

c  1-1 --> 0
c    (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0 ∧ -p_570) -> (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧ -b^{95, 7}_0)
c  in CNF:
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_2
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_1
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_0
c  in DIMACS:
 19193  19194 -19195  570 -19196 0
 19193  19194 -19195  570 -19197 0
 19193  19194 -19195  570 -19198 0

c  0-1 --> -1
c    (-b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧ -p_570) -> ( b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0)
c  in CNF:
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨  b^{95, 7}_2
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_1
c     b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨  b^{95, 7}_0
c  in DIMACS:
 19193  19194  19195  570  19196 0
 19193  19194  19195  570 -19197 0
 19193  19194  19195  570  19198 0

c  -1-1 --> -2
c    ( b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧  b^{95, 6}_0 ∧ -p_570) -> ( b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0)
c  in CNF:
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨  b^{95, 7}_2
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨  b^{95, 7}_1
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨  p_570 ∨ -b^{95, 7}_0
c  in DIMACS:
-19193  19194 -19195  570  19196 0
-19193  19194 -19195  570  19197 0
-19193  19194 -19195  570 -19198 0

c  -2-1 --> break 
c    ( b^{95, 6}_2 ∧  b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨  b^{95, 6}_0 ∨  p_570 ∨ break
c  in DIMACS:
-19193 -19194  19195  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 6}_2 ∧ -b^{95, 6}_1 ∧ -b^{95, 6}_0 ∧ true) 
c  in CNF:
c    -b^{95, 6}_2 ∨  b^{95, 6}_1 ∨  b^{95, 6}_0 ∨ false 
c  in DIMACS:
-19193  19194  19195  0

c  3 does not represent an automaton state.
c    -(-b^{95, 6}_2 ∧  b^{95, 6}_1 ∧  b^{95, 6}_0 ∧ true) 
c  in CNF:
c     b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ false 
c  in DIMACS:
 19193 -19194 -19195  0
c  -3 does not represent an automaton state.
c    -( b^{95, 6}_2 ∧  b^{95, 6}_1 ∧  b^{95, 6}_0 ∧ true) 
c  in CNF:
c    -b^{95, 6}_2 ∨ -b^{95, 6}_1 ∨ -b^{95, 6}_0 ∨ false 
c  in DIMACS:
-19193 -19194 -19195  0

c i = 7
c  -2+1 --> -1
c    ( b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧  p_665) -> ( b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0)
c  in CNF:
c    -b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨  b^{95, 8}_2
c    -b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_1
c    -b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨  b^{95, 8}_0
c  in DIMACS:
-19196 -19197  19198 -665  19199 0
-19196 -19197  19198 -665 -19200 0
-19196 -19197  19198 -665  19201 0

c  -1+1 --> 0
c    ( b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0 ∧  p_665) -> (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧ -b^{95, 8}_0)
c  in CNF:
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_2
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_1
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_0
c  in DIMACS:
-19196  19197 -19198 -665 -19199 0
-19196  19197 -19198 -665 -19200 0
-19196  19197 -19198 -665 -19201 0

c  0+1 --> 1
c    (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧  p_665) -> (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0)
c  in CNF:
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_2
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_1
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨  b^{95, 8}_0
c  in DIMACS:
 19196  19197  19198 -665 -19199 0
 19196  19197  19198 -665 -19200 0
 19196  19197  19198 -665  19201 0

c  1+1 --> 2
c    (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0 ∧  p_665) -> (-b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0)
c  in CNF:
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_2
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨  b^{95, 8}_1
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ -p_665 ∨ -b^{95, 8}_0
c  in DIMACS:
 19196  19197 -19198 -665 -19199 0
 19196  19197 -19198 -665  19200 0
 19196  19197 -19198 -665 -19201 0

c  2+1 --> break 
c    (-b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧  p_665) -> break
c  in CNF:
c     b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 19196 -19197  19198 -665 1162 0


c  2-1 --> 1
c    (-b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧ -p_665) -> (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0)
c  in CNF:
c     b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_2
c     b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_1
c     b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨  b^{95, 8}_0
c  in DIMACS:
 19196 -19197  19198  665 -19199 0
 19196 -19197  19198  665 -19200 0
 19196 -19197  19198  665  19201 0

c  1-1 --> 0
c    (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0 ∧ -p_665) -> (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧ -b^{95, 8}_0)
c  in CNF:
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_2
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_1
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_0
c  in DIMACS:
 19196  19197 -19198  665 -19199 0
 19196  19197 -19198  665 -19200 0
 19196  19197 -19198  665 -19201 0

c  0-1 --> -1
c    (-b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧ -p_665) -> ( b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0)
c  in CNF:
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨  b^{95, 8}_2
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_1
c     b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨  b^{95, 8}_0
c  in DIMACS:
 19196  19197  19198  665  19199 0
 19196  19197  19198  665 -19200 0
 19196  19197  19198  665  19201 0

c  -1-1 --> -2
c    ( b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧  b^{95, 7}_0 ∧ -p_665) -> ( b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0)
c  in CNF:
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨  b^{95, 8}_2
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨  b^{95, 8}_1
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨  p_665 ∨ -b^{95, 8}_0
c  in DIMACS:
-19196  19197 -19198  665  19199 0
-19196  19197 -19198  665  19200 0
-19196  19197 -19198  665 -19201 0

c  -2-1 --> break 
c    ( b^{95, 7}_2 ∧  b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨  b^{95, 7}_0 ∨  p_665 ∨ break
c  in DIMACS:
-19196 -19197  19198  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 7}_2 ∧ -b^{95, 7}_1 ∧ -b^{95, 7}_0 ∧ true) 
c  in CNF:
c    -b^{95, 7}_2 ∨  b^{95, 7}_1 ∨  b^{95, 7}_0 ∨ false 
c  in DIMACS:
-19196  19197  19198  0

c  3 does not represent an automaton state.
c    -(-b^{95, 7}_2 ∧  b^{95, 7}_1 ∧  b^{95, 7}_0 ∧ true) 
c  in CNF:
c     b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ false 
c  in DIMACS:
 19196 -19197 -19198  0
c  -3 does not represent an automaton state.
c    -( b^{95, 7}_2 ∧  b^{95, 7}_1 ∧  b^{95, 7}_0 ∧ true) 
c  in CNF:
c    -b^{95, 7}_2 ∨ -b^{95, 7}_1 ∨ -b^{95, 7}_0 ∨ false 
c  in DIMACS:
-19196 -19197 -19198  0

c i = 8
c  -2+1 --> -1
c    ( b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧  p_760) -> ( b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0)
c  in CNF:
c    -b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨  b^{95, 9}_2
c    -b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_1
c    -b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨  b^{95, 9}_0
c  in DIMACS:
-19199 -19200  19201 -760  19202 0
-19199 -19200  19201 -760 -19203 0
-19199 -19200  19201 -760  19204 0

c  -1+1 --> 0
c    ( b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0 ∧  p_760) -> (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧ -b^{95, 9}_0)
c  in CNF:
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_2
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_1
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_0
c  in DIMACS:
-19199  19200 -19201 -760 -19202 0
-19199  19200 -19201 -760 -19203 0
-19199  19200 -19201 -760 -19204 0

c  0+1 --> 1
c    (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧  p_760) -> (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0)
c  in CNF:
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_2
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_1
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨  b^{95, 9}_0
c  in DIMACS:
 19199  19200  19201 -760 -19202 0
 19199  19200  19201 -760 -19203 0
 19199  19200  19201 -760  19204 0

c  1+1 --> 2
c    (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0 ∧  p_760) -> (-b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0)
c  in CNF:
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_2
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨  b^{95, 9}_1
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ -p_760 ∨ -b^{95, 9}_0
c  in DIMACS:
 19199  19200 -19201 -760 -19202 0
 19199  19200 -19201 -760  19203 0
 19199  19200 -19201 -760 -19204 0

c  2+1 --> break 
c    (-b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧  p_760) -> break
c  in CNF:
c     b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 19199 -19200  19201 -760 1162 0


c  2-1 --> 1
c    (-b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧ -p_760) -> (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0)
c  in CNF:
c     b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_2
c     b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_1
c     b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨  b^{95, 9}_0
c  in DIMACS:
 19199 -19200  19201  760 -19202 0
 19199 -19200  19201  760 -19203 0
 19199 -19200  19201  760  19204 0

c  1-1 --> 0
c    (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0 ∧ -p_760) -> (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧ -b^{95, 9}_0)
c  in CNF:
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_2
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_1
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_0
c  in DIMACS:
 19199  19200 -19201  760 -19202 0
 19199  19200 -19201  760 -19203 0
 19199  19200 -19201  760 -19204 0

c  0-1 --> -1
c    (-b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧ -p_760) -> ( b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0)
c  in CNF:
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨  b^{95, 9}_2
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_1
c     b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨  b^{95, 9}_0
c  in DIMACS:
 19199  19200  19201  760  19202 0
 19199  19200  19201  760 -19203 0
 19199  19200  19201  760  19204 0

c  -1-1 --> -2
c    ( b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧  b^{95, 8}_0 ∧ -p_760) -> ( b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0)
c  in CNF:
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨  b^{95, 9}_2
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨  b^{95, 9}_1
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨  p_760 ∨ -b^{95, 9}_0
c  in DIMACS:
-19199  19200 -19201  760  19202 0
-19199  19200 -19201  760  19203 0
-19199  19200 -19201  760 -19204 0

c  -2-1 --> break 
c    ( b^{95, 8}_2 ∧  b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨  b^{95, 8}_0 ∨  p_760 ∨ break
c  in DIMACS:
-19199 -19200  19201  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 8}_2 ∧ -b^{95, 8}_1 ∧ -b^{95, 8}_0 ∧ true) 
c  in CNF:
c    -b^{95, 8}_2 ∨  b^{95, 8}_1 ∨  b^{95, 8}_0 ∨ false 
c  in DIMACS:
-19199  19200  19201  0

c  3 does not represent an automaton state.
c    -(-b^{95, 8}_2 ∧  b^{95, 8}_1 ∧  b^{95, 8}_0 ∧ true) 
c  in CNF:
c     b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ false 
c  in DIMACS:
 19199 -19200 -19201  0
c  -3 does not represent an automaton state.
c    -( b^{95, 8}_2 ∧  b^{95, 8}_1 ∧  b^{95, 8}_0 ∧ true) 
c  in CNF:
c    -b^{95, 8}_2 ∨ -b^{95, 8}_1 ∨ -b^{95, 8}_0 ∨ false 
c  in DIMACS:
-19199 -19200 -19201  0

c i = 9
c  -2+1 --> -1
c    ( b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧  p_855) -> ( b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0)
c  in CNF:
c    -b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨  b^{95, 10}_2
c    -b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_1
c    -b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨  b^{95, 10}_0
c  in DIMACS:
-19202 -19203  19204 -855  19205 0
-19202 -19203  19204 -855 -19206 0
-19202 -19203  19204 -855  19207 0

c  -1+1 --> 0
c    ( b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0 ∧  p_855) -> (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧ -b^{95, 10}_0)
c  in CNF:
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_2
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_1
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_0
c  in DIMACS:
-19202  19203 -19204 -855 -19205 0
-19202  19203 -19204 -855 -19206 0
-19202  19203 -19204 -855 -19207 0

c  0+1 --> 1
c    (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧  p_855) -> (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0)
c  in CNF:
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_2
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_1
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨  b^{95, 10}_0
c  in DIMACS:
 19202  19203  19204 -855 -19205 0
 19202  19203  19204 -855 -19206 0
 19202  19203  19204 -855  19207 0

c  1+1 --> 2
c    (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0 ∧  p_855) -> (-b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0)
c  in CNF:
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_2
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨  b^{95, 10}_1
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ -p_855 ∨ -b^{95, 10}_0
c  in DIMACS:
 19202  19203 -19204 -855 -19205 0
 19202  19203 -19204 -855  19206 0
 19202  19203 -19204 -855 -19207 0

c  2+1 --> break 
c    (-b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧  p_855) -> break
c  in CNF:
c     b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 19202 -19203  19204 -855 1162 0


c  2-1 --> 1
c    (-b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧ -p_855) -> (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0)
c  in CNF:
c     b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_2
c     b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_1
c     b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨  b^{95, 10}_0
c  in DIMACS:
 19202 -19203  19204  855 -19205 0
 19202 -19203  19204  855 -19206 0
 19202 -19203  19204  855  19207 0

c  1-1 --> 0
c    (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0 ∧ -p_855) -> (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧ -b^{95, 10}_0)
c  in CNF:
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_2
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_1
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_0
c  in DIMACS:
 19202  19203 -19204  855 -19205 0
 19202  19203 -19204  855 -19206 0
 19202  19203 -19204  855 -19207 0

c  0-1 --> -1
c    (-b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧ -p_855) -> ( b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0)
c  in CNF:
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨  b^{95, 10}_2
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_1
c     b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨  b^{95, 10}_0
c  in DIMACS:
 19202  19203  19204  855  19205 0
 19202  19203  19204  855 -19206 0
 19202  19203  19204  855  19207 0

c  -1-1 --> -2
c    ( b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧  b^{95, 9}_0 ∧ -p_855) -> ( b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0)
c  in CNF:
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨  b^{95, 10}_2
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨  b^{95, 10}_1
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨  p_855 ∨ -b^{95, 10}_0
c  in DIMACS:
-19202  19203 -19204  855  19205 0
-19202  19203 -19204  855  19206 0
-19202  19203 -19204  855 -19207 0

c  -2-1 --> break 
c    ( b^{95, 9}_2 ∧  b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨  b^{95, 9}_0 ∨  p_855 ∨ break
c  in DIMACS:
-19202 -19203  19204  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 9}_2 ∧ -b^{95, 9}_1 ∧ -b^{95, 9}_0 ∧ true) 
c  in CNF:
c    -b^{95, 9}_2 ∨  b^{95, 9}_1 ∨  b^{95, 9}_0 ∨ false 
c  in DIMACS:
-19202  19203  19204  0

c  3 does not represent an automaton state.
c    -(-b^{95, 9}_2 ∧  b^{95, 9}_1 ∧  b^{95, 9}_0 ∧ true) 
c  in CNF:
c     b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ false 
c  in DIMACS:
 19202 -19203 -19204  0
c  -3 does not represent an automaton state.
c    -( b^{95, 9}_2 ∧  b^{95, 9}_1 ∧  b^{95, 9}_0 ∧ true) 
c  in CNF:
c    -b^{95, 9}_2 ∨ -b^{95, 9}_1 ∨ -b^{95, 9}_0 ∨ false 
c  in DIMACS:
-19202 -19203 -19204  0

c i = 10
c  -2+1 --> -1
c    ( b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧  p_950) -> ( b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0)
c  in CNF:
c    -b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨  b^{95, 11}_2
c    -b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_1
c    -b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨  b^{95, 11}_0
c  in DIMACS:
-19205 -19206  19207 -950  19208 0
-19205 -19206  19207 -950 -19209 0
-19205 -19206  19207 -950  19210 0

c  -1+1 --> 0
c    ( b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0 ∧  p_950) -> (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧ -b^{95, 11}_0)
c  in CNF:
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_2
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_1
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_0
c  in DIMACS:
-19205  19206 -19207 -950 -19208 0
-19205  19206 -19207 -950 -19209 0
-19205  19206 -19207 -950 -19210 0

c  0+1 --> 1
c    (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧  p_950) -> (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0)
c  in CNF:
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_2
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_1
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨  b^{95, 11}_0
c  in DIMACS:
 19205  19206  19207 -950 -19208 0
 19205  19206  19207 -950 -19209 0
 19205  19206  19207 -950  19210 0

c  1+1 --> 2
c    (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0 ∧  p_950) -> (-b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0)
c  in CNF:
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_2
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨  b^{95, 11}_1
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ -p_950 ∨ -b^{95, 11}_0
c  in DIMACS:
 19205  19206 -19207 -950 -19208 0
 19205  19206 -19207 -950  19209 0
 19205  19206 -19207 -950 -19210 0

c  2+1 --> break 
c    (-b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧  p_950) -> break
c  in CNF:
c     b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 19205 -19206  19207 -950 1162 0


c  2-1 --> 1
c    (-b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧ -p_950) -> (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0)
c  in CNF:
c     b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_2
c     b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_1
c     b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨  b^{95, 11}_0
c  in DIMACS:
 19205 -19206  19207  950 -19208 0
 19205 -19206  19207  950 -19209 0
 19205 -19206  19207  950  19210 0

c  1-1 --> 0
c    (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0 ∧ -p_950) -> (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧ -b^{95, 11}_0)
c  in CNF:
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_2
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_1
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_0
c  in DIMACS:
 19205  19206 -19207  950 -19208 0
 19205  19206 -19207  950 -19209 0
 19205  19206 -19207  950 -19210 0

c  0-1 --> -1
c    (-b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧ -p_950) -> ( b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0)
c  in CNF:
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨  b^{95, 11}_2
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_1
c     b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨  b^{95, 11}_0
c  in DIMACS:
 19205  19206  19207  950  19208 0
 19205  19206  19207  950 -19209 0
 19205  19206  19207  950  19210 0

c  -1-1 --> -2
c    ( b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧  b^{95, 10}_0 ∧ -p_950) -> ( b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0)
c  in CNF:
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨  b^{95, 11}_2
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨  b^{95, 11}_1
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨  p_950 ∨ -b^{95, 11}_0
c  in DIMACS:
-19205  19206 -19207  950  19208 0
-19205  19206 -19207  950  19209 0
-19205  19206 -19207  950 -19210 0

c  -2-1 --> break 
c    ( b^{95, 10}_2 ∧  b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨  b^{95, 10}_0 ∨  p_950 ∨ break
c  in DIMACS:
-19205 -19206  19207  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 10}_2 ∧ -b^{95, 10}_1 ∧ -b^{95, 10}_0 ∧ true) 
c  in CNF:
c    -b^{95, 10}_2 ∨  b^{95, 10}_1 ∨  b^{95, 10}_0 ∨ false 
c  in DIMACS:
-19205  19206  19207  0

c  3 does not represent an automaton state.
c    -(-b^{95, 10}_2 ∧  b^{95, 10}_1 ∧  b^{95, 10}_0 ∧ true) 
c  in CNF:
c     b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ false 
c  in DIMACS:
 19205 -19206 -19207  0
c  -3 does not represent an automaton state.
c    -( b^{95, 10}_2 ∧  b^{95, 10}_1 ∧  b^{95, 10}_0 ∧ true) 
c  in CNF:
c    -b^{95, 10}_2 ∨ -b^{95, 10}_1 ∨ -b^{95, 10}_0 ∨ false 
c  in DIMACS:
-19205 -19206 -19207  0

c i = 11
c  -2+1 --> -1
c    ( b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧  p_1045) -> ( b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0)
c  in CNF:
c    -b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨  b^{95, 12}_2
c    -b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_1
c    -b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨  b^{95, 12}_0
c  in DIMACS:
-19208 -19209  19210 -1045  19211 0
-19208 -19209  19210 -1045 -19212 0
-19208 -19209  19210 -1045  19213 0

c  -1+1 --> 0
c    ( b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0 ∧  p_1045) -> (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧ -b^{95, 12}_0)
c  in CNF:
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_2
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_1
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_0
c  in DIMACS:
-19208  19209 -19210 -1045 -19211 0
-19208  19209 -19210 -1045 -19212 0
-19208  19209 -19210 -1045 -19213 0

c  0+1 --> 1
c    (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧  p_1045) -> (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0)
c  in CNF:
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_2
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_1
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨  b^{95, 12}_0
c  in DIMACS:
 19208  19209  19210 -1045 -19211 0
 19208  19209  19210 -1045 -19212 0
 19208  19209  19210 -1045  19213 0

c  1+1 --> 2
c    (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0 ∧  p_1045) -> (-b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0)
c  in CNF:
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_2
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨  b^{95, 12}_1
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ -p_1045 ∨ -b^{95, 12}_0
c  in DIMACS:
 19208  19209 -19210 -1045 -19211 0
 19208  19209 -19210 -1045  19212 0
 19208  19209 -19210 -1045 -19213 0

c  2+1 --> break 
c    (-b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 19208 -19209  19210 -1045 1162 0


c  2-1 --> 1
c    (-b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧ -p_1045) -> (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0)
c  in CNF:
c     b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_2
c     b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_1
c     b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨  b^{95, 12}_0
c  in DIMACS:
 19208 -19209  19210  1045 -19211 0
 19208 -19209  19210  1045 -19212 0
 19208 -19209  19210  1045  19213 0

c  1-1 --> 0
c    (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0 ∧ -p_1045) -> (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧ -b^{95, 12}_0)
c  in CNF:
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_2
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_1
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_0
c  in DIMACS:
 19208  19209 -19210  1045 -19211 0
 19208  19209 -19210  1045 -19212 0
 19208  19209 -19210  1045 -19213 0

c  0-1 --> -1
c    (-b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧ -p_1045) -> ( b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0)
c  in CNF:
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨  b^{95, 12}_2
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_1
c     b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨  b^{95, 12}_0
c  in DIMACS:
 19208  19209  19210  1045  19211 0
 19208  19209  19210  1045 -19212 0
 19208  19209  19210  1045  19213 0

c  -1-1 --> -2
c    ( b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧  b^{95, 11}_0 ∧ -p_1045) -> ( b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0)
c  in CNF:
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨  b^{95, 12}_2
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨  b^{95, 12}_1
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨  p_1045 ∨ -b^{95, 12}_0
c  in DIMACS:
-19208  19209 -19210  1045  19211 0
-19208  19209 -19210  1045  19212 0
-19208  19209 -19210  1045 -19213 0

c  -2-1 --> break 
c    ( b^{95, 11}_2 ∧  b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨  b^{95, 11}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-19208 -19209  19210  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 11}_2 ∧ -b^{95, 11}_1 ∧ -b^{95, 11}_0 ∧ true) 
c  in CNF:
c    -b^{95, 11}_2 ∨  b^{95, 11}_1 ∨  b^{95, 11}_0 ∨ false 
c  in DIMACS:
-19208  19209  19210  0

c  3 does not represent an automaton state.
c    -(-b^{95, 11}_2 ∧  b^{95, 11}_1 ∧  b^{95, 11}_0 ∧ true) 
c  in CNF:
c     b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ false 
c  in DIMACS:
 19208 -19209 -19210  0
c  -3 does not represent an automaton state.
c    -( b^{95, 11}_2 ∧  b^{95, 11}_1 ∧  b^{95, 11}_0 ∧ true) 
c  in CNF:
c    -b^{95, 11}_2 ∨ -b^{95, 11}_1 ∨ -b^{95, 11}_0 ∨ false 
c  in DIMACS:
-19208 -19209 -19210  0

c i = 12
c  -2+1 --> -1
c    ( b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧  p_1140) -> ( b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧  b^{95, 13}_0)
c  in CNF:
c    -b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨  b^{95, 13}_2
c    -b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_1
c    -b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨  b^{95, 13}_0
c  in DIMACS:
-19211 -19212  19213 -1140  19214 0
-19211 -19212  19213 -1140 -19215 0
-19211 -19212  19213 -1140  19216 0

c  -1+1 --> 0
c    ( b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0 ∧  p_1140) -> (-b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧ -b^{95, 13}_0)
c  in CNF:
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_2
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_1
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_0
c  in DIMACS:
-19211  19212 -19213 -1140 -19214 0
-19211  19212 -19213 -1140 -19215 0
-19211  19212 -19213 -1140 -19216 0

c  0+1 --> 1
c    (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧  p_1140) -> (-b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧  b^{95, 13}_0)
c  in CNF:
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_2
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_1
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨  b^{95, 13}_0
c  in DIMACS:
 19211  19212  19213 -1140 -19214 0
 19211  19212  19213 -1140 -19215 0
 19211  19212  19213 -1140  19216 0

c  1+1 --> 2
c    (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0 ∧  p_1140) -> (-b^{95, 13}_2 ∧  b^{95, 13}_1 ∧ -b^{95, 13}_0)
c  in CNF:
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_2
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨  b^{95, 13}_1
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ -p_1140 ∨ -b^{95, 13}_0
c  in DIMACS:
 19211  19212 -19213 -1140 -19214 0
 19211  19212 -19213 -1140  19215 0
 19211  19212 -19213 -1140 -19216 0

c  2+1 --> break 
c    (-b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 19211 -19212  19213 -1140 1162 0


c  2-1 --> 1
c    (-b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧ -p_1140) -> (-b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧  b^{95, 13}_0)
c  in CNF:
c     b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_2
c     b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_1
c     b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨  b^{95, 13}_0
c  in DIMACS:
 19211 -19212  19213  1140 -19214 0
 19211 -19212  19213  1140 -19215 0
 19211 -19212  19213  1140  19216 0

c  1-1 --> 0
c    (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0 ∧ -p_1140) -> (-b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧ -b^{95, 13}_0)
c  in CNF:
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_2
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_1
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_0
c  in DIMACS:
 19211  19212 -19213  1140 -19214 0
 19211  19212 -19213  1140 -19215 0
 19211  19212 -19213  1140 -19216 0

c  0-1 --> -1
c    (-b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧ -p_1140) -> ( b^{95, 13}_2 ∧ -b^{95, 13}_1 ∧  b^{95, 13}_0)
c  in CNF:
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨  b^{95, 13}_2
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_1
c     b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨  b^{95, 13}_0
c  in DIMACS:
 19211  19212  19213  1140  19214 0
 19211  19212  19213  1140 -19215 0
 19211  19212  19213  1140  19216 0

c  -1-1 --> -2
c    ( b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧  b^{95, 12}_0 ∧ -p_1140) -> ( b^{95, 13}_2 ∧  b^{95, 13}_1 ∧ -b^{95, 13}_0)
c  in CNF:
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨  b^{95, 13}_2
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨  b^{95, 13}_1
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨  p_1140 ∨ -b^{95, 13}_0
c  in DIMACS:
-19211  19212 -19213  1140  19214 0
-19211  19212 -19213  1140  19215 0
-19211  19212 -19213  1140 -19216 0

c  -2-1 --> break 
c    ( b^{95, 12}_2 ∧  b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨  b^{95, 12}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-19211 -19212  19213  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{95, 12}_2 ∧ -b^{95, 12}_1 ∧ -b^{95, 12}_0 ∧ true) 
c  in CNF:
c    -b^{95, 12}_2 ∨  b^{95, 12}_1 ∨  b^{95, 12}_0 ∨ false 
c  in DIMACS:
-19211  19212  19213  0

c  3 does not represent an automaton state.
c    -(-b^{95, 12}_2 ∧  b^{95, 12}_1 ∧  b^{95, 12}_0 ∧ true) 
c  in CNF:
c     b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ false 
c  in DIMACS:
 19211 -19212 -19213  0
c  -3 does not represent an automaton state.
c    -( b^{95, 12}_2 ∧  b^{95, 12}_1 ∧  b^{95, 12}_0 ∧ true) 
c  in CNF:
c    -b^{95, 12}_2 ∨ -b^{95, 12}_1 ∨ -b^{95, 12}_0 ∨ false 
c  in DIMACS:
-19211 -19212 -19213  0

c INIT for k = 96
c    -b^{96, 1}_2
c    -b^{96, 1}_1
c    -b^{96, 1}_0
c  in DIMACS:
-19217 0
-19218 0
-19219 0

c Transitions for k = 96
c i = 1
c  -2+1 --> -1
c    ( b^{96, 1}_2 ∧  b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧  p_96) -> ( b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0)
c  in CNF:
c    -b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨  b^{96, 2}_2
c    -b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_1
c    -b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨  b^{96, 2}_0
c  in DIMACS:
-19217 -19218  19219 -96  19220 0
-19217 -19218  19219 -96 -19221 0
-19217 -19218  19219 -96  19222 0

c  -1+1 --> 0
c    ( b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧  b^{96, 1}_0 ∧  p_96) -> (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧ -b^{96, 2}_0)
c  in CNF:
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_2
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_1
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_0
c  in DIMACS:
-19217  19218 -19219 -96 -19220 0
-19217  19218 -19219 -96 -19221 0
-19217  19218 -19219 -96 -19222 0

c  0+1 --> 1
c    (-b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧  p_96) -> (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0)
c  in CNF:
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_2
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_1
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨  b^{96, 2}_0
c  in DIMACS:
 19217  19218  19219 -96 -19220 0
 19217  19218  19219 -96 -19221 0
 19217  19218  19219 -96  19222 0

c  1+1 --> 2
c    (-b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧  b^{96, 1}_0 ∧  p_96) -> (-b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0)
c  in CNF:
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_2
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨  b^{96, 2}_1
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ -p_96 ∨ -b^{96, 2}_0
c  in DIMACS:
 19217  19218 -19219 -96 -19220 0
 19217  19218 -19219 -96  19221 0
 19217  19218 -19219 -96 -19222 0

c  2+1 --> break 
c    (-b^{96, 1}_2 ∧  b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧  p_96) -> break
c  in CNF:
c     b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ -p_96 ∨ break
c  in DIMACS:
 19217 -19218  19219 -96 1162 0


c  2-1 --> 1
c    (-b^{96, 1}_2 ∧  b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧ -p_96) -> (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0)
c  in CNF:
c     b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_2
c     b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_1
c     b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨  b^{96, 2}_0
c  in DIMACS:
 19217 -19218  19219  96 -19220 0
 19217 -19218  19219  96 -19221 0
 19217 -19218  19219  96  19222 0

c  1-1 --> 0
c    (-b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧  b^{96, 1}_0 ∧ -p_96) -> (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧ -b^{96, 2}_0)
c  in CNF:
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_2
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_1
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_0
c  in DIMACS:
 19217  19218 -19219  96 -19220 0
 19217  19218 -19219  96 -19221 0
 19217  19218 -19219  96 -19222 0

c  0-1 --> -1
c    (-b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧ -p_96) -> ( b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0)
c  in CNF:
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨  b^{96, 2}_2
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_1
c     b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨  b^{96, 2}_0
c  in DIMACS:
 19217  19218  19219  96  19220 0
 19217  19218  19219  96 -19221 0
 19217  19218  19219  96  19222 0

c  -1-1 --> -2
c    ( b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧  b^{96, 1}_0 ∧ -p_96) -> ( b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0)
c  in CNF:
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨  b^{96, 2}_2
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨  b^{96, 2}_1
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨  p_96 ∨ -b^{96, 2}_0
c  in DIMACS:
-19217  19218 -19219  96  19220 0
-19217  19218 -19219  96  19221 0
-19217  19218 -19219  96 -19222 0

c  -2-1 --> break 
c    ( b^{96, 1}_2 ∧  b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧ -p_96) -> break
c  in CNF:
c    -b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨  b^{96, 1}_0 ∨  p_96 ∨ break
c  in DIMACS:
-19217 -19218  19219  96 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 1}_2 ∧ -b^{96, 1}_1 ∧ -b^{96, 1}_0 ∧ true) 
c  in CNF:
c    -b^{96, 1}_2 ∨  b^{96, 1}_1 ∨  b^{96, 1}_0 ∨ false 
c  in DIMACS:
-19217  19218  19219  0

c  3 does not represent an automaton state.
c    -(-b^{96, 1}_2 ∧  b^{96, 1}_1 ∧  b^{96, 1}_0 ∧ true) 
c  in CNF:
c     b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ false 
c  in DIMACS:
 19217 -19218 -19219  0
c  -3 does not represent an automaton state.
c    -( b^{96, 1}_2 ∧  b^{96, 1}_1 ∧  b^{96, 1}_0 ∧ true) 
c  in CNF:
c    -b^{96, 1}_2 ∨ -b^{96, 1}_1 ∨ -b^{96, 1}_0 ∨ false 
c  in DIMACS:
-19217 -19218 -19219  0

c i = 2
c  -2+1 --> -1
c    ( b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧  p_192) -> ( b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0)
c  in CNF:
c    -b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨  b^{96, 3}_2
c    -b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_1
c    -b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨  b^{96, 3}_0
c  in DIMACS:
-19220 -19221  19222 -192  19223 0
-19220 -19221  19222 -192 -19224 0
-19220 -19221  19222 -192  19225 0

c  -1+1 --> 0
c    ( b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0 ∧  p_192) -> (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧ -b^{96, 3}_0)
c  in CNF:
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_2
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_1
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_0
c  in DIMACS:
-19220  19221 -19222 -192 -19223 0
-19220  19221 -19222 -192 -19224 0
-19220  19221 -19222 -192 -19225 0

c  0+1 --> 1
c    (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧  p_192) -> (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0)
c  in CNF:
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_2
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_1
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨  b^{96, 3}_0
c  in DIMACS:
 19220  19221  19222 -192 -19223 0
 19220  19221  19222 -192 -19224 0
 19220  19221  19222 -192  19225 0

c  1+1 --> 2
c    (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0 ∧  p_192) -> (-b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0)
c  in CNF:
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_2
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨  b^{96, 3}_1
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ -p_192 ∨ -b^{96, 3}_0
c  in DIMACS:
 19220  19221 -19222 -192 -19223 0
 19220  19221 -19222 -192  19224 0
 19220  19221 -19222 -192 -19225 0

c  2+1 --> break 
c    (-b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧  p_192) -> break
c  in CNF:
c     b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 19220 -19221  19222 -192 1162 0


c  2-1 --> 1
c    (-b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧ -p_192) -> (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0)
c  in CNF:
c     b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_2
c     b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_1
c     b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨  b^{96, 3}_0
c  in DIMACS:
 19220 -19221  19222  192 -19223 0
 19220 -19221  19222  192 -19224 0
 19220 -19221  19222  192  19225 0

c  1-1 --> 0
c    (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0 ∧ -p_192) -> (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧ -b^{96, 3}_0)
c  in CNF:
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_2
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_1
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_0
c  in DIMACS:
 19220  19221 -19222  192 -19223 0
 19220  19221 -19222  192 -19224 0
 19220  19221 -19222  192 -19225 0

c  0-1 --> -1
c    (-b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧ -p_192) -> ( b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0)
c  in CNF:
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨  b^{96, 3}_2
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_1
c     b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨  b^{96, 3}_0
c  in DIMACS:
 19220  19221  19222  192  19223 0
 19220  19221  19222  192 -19224 0
 19220  19221  19222  192  19225 0

c  -1-1 --> -2
c    ( b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧  b^{96, 2}_0 ∧ -p_192) -> ( b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0)
c  in CNF:
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨  b^{96, 3}_2
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨  b^{96, 3}_1
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨  p_192 ∨ -b^{96, 3}_0
c  in DIMACS:
-19220  19221 -19222  192  19223 0
-19220  19221 -19222  192  19224 0
-19220  19221 -19222  192 -19225 0

c  -2-1 --> break 
c    ( b^{96, 2}_2 ∧  b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨  b^{96, 2}_0 ∨  p_192 ∨ break
c  in DIMACS:
-19220 -19221  19222  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 2}_2 ∧ -b^{96, 2}_1 ∧ -b^{96, 2}_0 ∧ true) 
c  in CNF:
c    -b^{96, 2}_2 ∨  b^{96, 2}_1 ∨  b^{96, 2}_0 ∨ false 
c  in DIMACS:
-19220  19221  19222  0

c  3 does not represent an automaton state.
c    -(-b^{96, 2}_2 ∧  b^{96, 2}_1 ∧  b^{96, 2}_0 ∧ true) 
c  in CNF:
c     b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ false 
c  in DIMACS:
 19220 -19221 -19222  0
c  -3 does not represent an automaton state.
c    -( b^{96, 2}_2 ∧  b^{96, 2}_1 ∧  b^{96, 2}_0 ∧ true) 
c  in CNF:
c    -b^{96, 2}_2 ∨ -b^{96, 2}_1 ∨ -b^{96, 2}_0 ∨ false 
c  in DIMACS:
-19220 -19221 -19222  0

c i = 3
c  -2+1 --> -1
c    ( b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧  p_288) -> ( b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0)
c  in CNF:
c    -b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨  b^{96, 4}_2
c    -b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_1
c    -b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨  b^{96, 4}_0
c  in DIMACS:
-19223 -19224  19225 -288  19226 0
-19223 -19224  19225 -288 -19227 0
-19223 -19224  19225 -288  19228 0

c  -1+1 --> 0
c    ( b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0 ∧  p_288) -> (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧ -b^{96, 4}_0)
c  in CNF:
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_2
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_1
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_0
c  in DIMACS:
-19223  19224 -19225 -288 -19226 0
-19223  19224 -19225 -288 -19227 0
-19223  19224 -19225 -288 -19228 0

c  0+1 --> 1
c    (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧  p_288) -> (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0)
c  in CNF:
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_2
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_1
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨  b^{96, 4}_0
c  in DIMACS:
 19223  19224  19225 -288 -19226 0
 19223  19224  19225 -288 -19227 0
 19223  19224  19225 -288  19228 0

c  1+1 --> 2
c    (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0 ∧  p_288) -> (-b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0)
c  in CNF:
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_2
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨  b^{96, 4}_1
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ -p_288 ∨ -b^{96, 4}_0
c  in DIMACS:
 19223  19224 -19225 -288 -19226 0
 19223  19224 -19225 -288  19227 0
 19223  19224 -19225 -288 -19228 0

c  2+1 --> break 
c    (-b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧  p_288) -> break
c  in CNF:
c     b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 19223 -19224  19225 -288 1162 0


c  2-1 --> 1
c    (-b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧ -p_288) -> (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0)
c  in CNF:
c     b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_2
c     b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_1
c     b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨  b^{96, 4}_0
c  in DIMACS:
 19223 -19224  19225  288 -19226 0
 19223 -19224  19225  288 -19227 0
 19223 -19224  19225  288  19228 0

c  1-1 --> 0
c    (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0 ∧ -p_288) -> (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧ -b^{96, 4}_0)
c  in CNF:
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_2
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_1
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_0
c  in DIMACS:
 19223  19224 -19225  288 -19226 0
 19223  19224 -19225  288 -19227 0
 19223  19224 -19225  288 -19228 0

c  0-1 --> -1
c    (-b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧ -p_288) -> ( b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0)
c  in CNF:
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨  b^{96, 4}_2
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_1
c     b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨  b^{96, 4}_0
c  in DIMACS:
 19223  19224  19225  288  19226 0
 19223  19224  19225  288 -19227 0
 19223  19224  19225  288  19228 0

c  -1-1 --> -2
c    ( b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧  b^{96, 3}_0 ∧ -p_288) -> ( b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0)
c  in CNF:
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨  b^{96, 4}_2
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨  b^{96, 4}_1
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨  p_288 ∨ -b^{96, 4}_0
c  in DIMACS:
-19223  19224 -19225  288  19226 0
-19223  19224 -19225  288  19227 0
-19223  19224 -19225  288 -19228 0

c  -2-1 --> break 
c    ( b^{96, 3}_2 ∧  b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨  b^{96, 3}_0 ∨  p_288 ∨ break
c  in DIMACS:
-19223 -19224  19225  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 3}_2 ∧ -b^{96, 3}_1 ∧ -b^{96, 3}_0 ∧ true) 
c  in CNF:
c    -b^{96, 3}_2 ∨  b^{96, 3}_1 ∨  b^{96, 3}_0 ∨ false 
c  in DIMACS:
-19223  19224  19225  0

c  3 does not represent an automaton state.
c    -(-b^{96, 3}_2 ∧  b^{96, 3}_1 ∧  b^{96, 3}_0 ∧ true) 
c  in CNF:
c     b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ false 
c  in DIMACS:
 19223 -19224 -19225  0
c  -3 does not represent an automaton state.
c    -( b^{96, 3}_2 ∧  b^{96, 3}_1 ∧  b^{96, 3}_0 ∧ true) 
c  in CNF:
c    -b^{96, 3}_2 ∨ -b^{96, 3}_1 ∨ -b^{96, 3}_0 ∨ false 
c  in DIMACS:
-19223 -19224 -19225  0

c i = 4
c  -2+1 --> -1
c    ( b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧  p_384) -> ( b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0)
c  in CNF:
c    -b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨  b^{96, 5}_2
c    -b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_1
c    -b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨  b^{96, 5}_0
c  in DIMACS:
-19226 -19227  19228 -384  19229 0
-19226 -19227  19228 -384 -19230 0
-19226 -19227  19228 -384  19231 0

c  -1+1 --> 0
c    ( b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0 ∧  p_384) -> (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧ -b^{96, 5}_0)
c  in CNF:
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_2
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_1
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_0
c  in DIMACS:
-19226  19227 -19228 -384 -19229 0
-19226  19227 -19228 -384 -19230 0
-19226  19227 -19228 -384 -19231 0

c  0+1 --> 1
c    (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧  p_384) -> (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0)
c  in CNF:
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_2
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_1
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨  b^{96, 5}_0
c  in DIMACS:
 19226  19227  19228 -384 -19229 0
 19226  19227  19228 -384 -19230 0
 19226  19227  19228 -384  19231 0

c  1+1 --> 2
c    (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0 ∧  p_384) -> (-b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0)
c  in CNF:
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_2
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨  b^{96, 5}_1
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ -p_384 ∨ -b^{96, 5}_0
c  in DIMACS:
 19226  19227 -19228 -384 -19229 0
 19226  19227 -19228 -384  19230 0
 19226  19227 -19228 -384 -19231 0

c  2+1 --> break 
c    (-b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧  p_384) -> break
c  in CNF:
c     b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 19226 -19227  19228 -384 1162 0


c  2-1 --> 1
c    (-b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧ -p_384) -> (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0)
c  in CNF:
c     b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_2
c     b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_1
c     b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨  b^{96, 5}_0
c  in DIMACS:
 19226 -19227  19228  384 -19229 0
 19226 -19227  19228  384 -19230 0
 19226 -19227  19228  384  19231 0

c  1-1 --> 0
c    (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0 ∧ -p_384) -> (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧ -b^{96, 5}_0)
c  in CNF:
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_2
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_1
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_0
c  in DIMACS:
 19226  19227 -19228  384 -19229 0
 19226  19227 -19228  384 -19230 0
 19226  19227 -19228  384 -19231 0

c  0-1 --> -1
c    (-b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧ -p_384) -> ( b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0)
c  in CNF:
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨  b^{96, 5}_2
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_1
c     b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨  b^{96, 5}_0
c  in DIMACS:
 19226  19227  19228  384  19229 0
 19226  19227  19228  384 -19230 0
 19226  19227  19228  384  19231 0

c  -1-1 --> -2
c    ( b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧  b^{96, 4}_0 ∧ -p_384) -> ( b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0)
c  in CNF:
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨  b^{96, 5}_2
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨  b^{96, 5}_1
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨  p_384 ∨ -b^{96, 5}_0
c  in DIMACS:
-19226  19227 -19228  384  19229 0
-19226  19227 -19228  384  19230 0
-19226  19227 -19228  384 -19231 0

c  -2-1 --> break 
c    ( b^{96, 4}_2 ∧  b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨  b^{96, 4}_0 ∨  p_384 ∨ break
c  in DIMACS:
-19226 -19227  19228  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 4}_2 ∧ -b^{96, 4}_1 ∧ -b^{96, 4}_0 ∧ true) 
c  in CNF:
c    -b^{96, 4}_2 ∨  b^{96, 4}_1 ∨  b^{96, 4}_0 ∨ false 
c  in DIMACS:
-19226  19227  19228  0

c  3 does not represent an automaton state.
c    -(-b^{96, 4}_2 ∧  b^{96, 4}_1 ∧  b^{96, 4}_0 ∧ true) 
c  in CNF:
c     b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ false 
c  in DIMACS:
 19226 -19227 -19228  0
c  -3 does not represent an automaton state.
c    -( b^{96, 4}_2 ∧  b^{96, 4}_1 ∧  b^{96, 4}_0 ∧ true) 
c  in CNF:
c    -b^{96, 4}_2 ∨ -b^{96, 4}_1 ∨ -b^{96, 4}_0 ∨ false 
c  in DIMACS:
-19226 -19227 -19228  0

c i = 5
c  -2+1 --> -1
c    ( b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧  p_480) -> ( b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0)
c  in CNF:
c    -b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨  b^{96, 6}_2
c    -b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_1
c    -b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨  b^{96, 6}_0
c  in DIMACS:
-19229 -19230  19231 -480  19232 0
-19229 -19230  19231 -480 -19233 0
-19229 -19230  19231 -480  19234 0

c  -1+1 --> 0
c    ( b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0 ∧  p_480) -> (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧ -b^{96, 6}_0)
c  in CNF:
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_2
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_1
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_0
c  in DIMACS:
-19229  19230 -19231 -480 -19232 0
-19229  19230 -19231 -480 -19233 0
-19229  19230 -19231 -480 -19234 0

c  0+1 --> 1
c    (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧  p_480) -> (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0)
c  in CNF:
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_2
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_1
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨  b^{96, 6}_0
c  in DIMACS:
 19229  19230  19231 -480 -19232 0
 19229  19230  19231 -480 -19233 0
 19229  19230  19231 -480  19234 0

c  1+1 --> 2
c    (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0 ∧  p_480) -> (-b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0)
c  in CNF:
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_2
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨  b^{96, 6}_1
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ -p_480 ∨ -b^{96, 6}_0
c  in DIMACS:
 19229  19230 -19231 -480 -19232 0
 19229  19230 -19231 -480  19233 0
 19229  19230 -19231 -480 -19234 0

c  2+1 --> break 
c    (-b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧  p_480) -> break
c  in CNF:
c     b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 19229 -19230  19231 -480 1162 0


c  2-1 --> 1
c    (-b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧ -p_480) -> (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0)
c  in CNF:
c     b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_2
c     b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_1
c     b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨  b^{96, 6}_0
c  in DIMACS:
 19229 -19230  19231  480 -19232 0
 19229 -19230  19231  480 -19233 0
 19229 -19230  19231  480  19234 0

c  1-1 --> 0
c    (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0 ∧ -p_480) -> (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧ -b^{96, 6}_0)
c  in CNF:
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_2
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_1
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_0
c  in DIMACS:
 19229  19230 -19231  480 -19232 0
 19229  19230 -19231  480 -19233 0
 19229  19230 -19231  480 -19234 0

c  0-1 --> -1
c    (-b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧ -p_480) -> ( b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0)
c  in CNF:
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨  b^{96, 6}_2
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_1
c     b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨  b^{96, 6}_0
c  in DIMACS:
 19229  19230  19231  480  19232 0
 19229  19230  19231  480 -19233 0
 19229  19230  19231  480  19234 0

c  -1-1 --> -2
c    ( b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧  b^{96, 5}_0 ∧ -p_480) -> ( b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0)
c  in CNF:
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨  b^{96, 6}_2
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨  b^{96, 6}_1
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨  p_480 ∨ -b^{96, 6}_0
c  in DIMACS:
-19229  19230 -19231  480  19232 0
-19229  19230 -19231  480  19233 0
-19229  19230 -19231  480 -19234 0

c  -2-1 --> break 
c    ( b^{96, 5}_2 ∧  b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨  b^{96, 5}_0 ∨  p_480 ∨ break
c  in DIMACS:
-19229 -19230  19231  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 5}_2 ∧ -b^{96, 5}_1 ∧ -b^{96, 5}_0 ∧ true) 
c  in CNF:
c    -b^{96, 5}_2 ∨  b^{96, 5}_1 ∨  b^{96, 5}_0 ∨ false 
c  in DIMACS:
-19229  19230  19231  0

c  3 does not represent an automaton state.
c    -(-b^{96, 5}_2 ∧  b^{96, 5}_1 ∧  b^{96, 5}_0 ∧ true) 
c  in CNF:
c     b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ false 
c  in DIMACS:
 19229 -19230 -19231  0
c  -3 does not represent an automaton state.
c    -( b^{96, 5}_2 ∧  b^{96, 5}_1 ∧  b^{96, 5}_0 ∧ true) 
c  in CNF:
c    -b^{96, 5}_2 ∨ -b^{96, 5}_1 ∨ -b^{96, 5}_0 ∨ false 
c  in DIMACS:
-19229 -19230 -19231  0

c i = 6
c  -2+1 --> -1
c    ( b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧  p_576) -> ( b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0)
c  in CNF:
c    -b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨  b^{96, 7}_2
c    -b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_1
c    -b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨  b^{96, 7}_0
c  in DIMACS:
-19232 -19233  19234 -576  19235 0
-19232 -19233  19234 -576 -19236 0
-19232 -19233  19234 -576  19237 0

c  -1+1 --> 0
c    ( b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0 ∧  p_576) -> (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧ -b^{96, 7}_0)
c  in CNF:
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_2
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_1
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_0
c  in DIMACS:
-19232  19233 -19234 -576 -19235 0
-19232  19233 -19234 -576 -19236 0
-19232  19233 -19234 -576 -19237 0

c  0+1 --> 1
c    (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧  p_576) -> (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0)
c  in CNF:
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_2
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_1
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨  b^{96, 7}_0
c  in DIMACS:
 19232  19233  19234 -576 -19235 0
 19232  19233  19234 -576 -19236 0
 19232  19233  19234 -576  19237 0

c  1+1 --> 2
c    (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0 ∧  p_576) -> (-b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0)
c  in CNF:
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_2
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨  b^{96, 7}_1
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ -p_576 ∨ -b^{96, 7}_0
c  in DIMACS:
 19232  19233 -19234 -576 -19235 0
 19232  19233 -19234 -576  19236 0
 19232  19233 -19234 -576 -19237 0

c  2+1 --> break 
c    (-b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧  p_576) -> break
c  in CNF:
c     b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 19232 -19233  19234 -576 1162 0


c  2-1 --> 1
c    (-b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧ -p_576) -> (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0)
c  in CNF:
c     b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_2
c     b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_1
c     b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨  b^{96, 7}_0
c  in DIMACS:
 19232 -19233  19234  576 -19235 0
 19232 -19233  19234  576 -19236 0
 19232 -19233  19234  576  19237 0

c  1-1 --> 0
c    (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0 ∧ -p_576) -> (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧ -b^{96, 7}_0)
c  in CNF:
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_2
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_1
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_0
c  in DIMACS:
 19232  19233 -19234  576 -19235 0
 19232  19233 -19234  576 -19236 0
 19232  19233 -19234  576 -19237 0

c  0-1 --> -1
c    (-b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧ -p_576) -> ( b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0)
c  in CNF:
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨  b^{96, 7}_2
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_1
c     b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨  b^{96, 7}_0
c  in DIMACS:
 19232  19233  19234  576  19235 0
 19232  19233  19234  576 -19236 0
 19232  19233  19234  576  19237 0

c  -1-1 --> -2
c    ( b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧  b^{96, 6}_0 ∧ -p_576) -> ( b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0)
c  in CNF:
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨  b^{96, 7}_2
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨  b^{96, 7}_1
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨  p_576 ∨ -b^{96, 7}_0
c  in DIMACS:
-19232  19233 -19234  576  19235 0
-19232  19233 -19234  576  19236 0
-19232  19233 -19234  576 -19237 0

c  -2-1 --> break 
c    ( b^{96, 6}_2 ∧  b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨  b^{96, 6}_0 ∨  p_576 ∨ break
c  in DIMACS:
-19232 -19233  19234  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 6}_2 ∧ -b^{96, 6}_1 ∧ -b^{96, 6}_0 ∧ true) 
c  in CNF:
c    -b^{96, 6}_2 ∨  b^{96, 6}_1 ∨  b^{96, 6}_0 ∨ false 
c  in DIMACS:
-19232  19233  19234  0

c  3 does not represent an automaton state.
c    -(-b^{96, 6}_2 ∧  b^{96, 6}_1 ∧  b^{96, 6}_0 ∧ true) 
c  in CNF:
c     b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ false 
c  in DIMACS:
 19232 -19233 -19234  0
c  -3 does not represent an automaton state.
c    -( b^{96, 6}_2 ∧  b^{96, 6}_1 ∧  b^{96, 6}_0 ∧ true) 
c  in CNF:
c    -b^{96, 6}_2 ∨ -b^{96, 6}_1 ∨ -b^{96, 6}_0 ∨ false 
c  in DIMACS:
-19232 -19233 -19234  0

c i = 7
c  -2+1 --> -1
c    ( b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧  p_672) -> ( b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0)
c  in CNF:
c    -b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨  b^{96, 8}_2
c    -b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_1
c    -b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨  b^{96, 8}_0
c  in DIMACS:
-19235 -19236  19237 -672  19238 0
-19235 -19236  19237 -672 -19239 0
-19235 -19236  19237 -672  19240 0

c  -1+1 --> 0
c    ( b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0 ∧  p_672) -> (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧ -b^{96, 8}_0)
c  in CNF:
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_2
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_1
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_0
c  in DIMACS:
-19235  19236 -19237 -672 -19238 0
-19235  19236 -19237 -672 -19239 0
-19235  19236 -19237 -672 -19240 0

c  0+1 --> 1
c    (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧  p_672) -> (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0)
c  in CNF:
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_2
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_1
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨  b^{96, 8}_0
c  in DIMACS:
 19235  19236  19237 -672 -19238 0
 19235  19236  19237 -672 -19239 0
 19235  19236  19237 -672  19240 0

c  1+1 --> 2
c    (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0 ∧  p_672) -> (-b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0)
c  in CNF:
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_2
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨  b^{96, 8}_1
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ -p_672 ∨ -b^{96, 8}_0
c  in DIMACS:
 19235  19236 -19237 -672 -19238 0
 19235  19236 -19237 -672  19239 0
 19235  19236 -19237 -672 -19240 0

c  2+1 --> break 
c    (-b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧  p_672) -> break
c  in CNF:
c     b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 19235 -19236  19237 -672 1162 0


c  2-1 --> 1
c    (-b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧ -p_672) -> (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0)
c  in CNF:
c     b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_2
c     b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_1
c     b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨  b^{96, 8}_0
c  in DIMACS:
 19235 -19236  19237  672 -19238 0
 19235 -19236  19237  672 -19239 0
 19235 -19236  19237  672  19240 0

c  1-1 --> 0
c    (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0 ∧ -p_672) -> (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧ -b^{96, 8}_0)
c  in CNF:
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_2
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_1
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_0
c  in DIMACS:
 19235  19236 -19237  672 -19238 0
 19235  19236 -19237  672 -19239 0
 19235  19236 -19237  672 -19240 0

c  0-1 --> -1
c    (-b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧ -p_672) -> ( b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0)
c  in CNF:
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨  b^{96, 8}_2
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_1
c     b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨  b^{96, 8}_0
c  in DIMACS:
 19235  19236  19237  672  19238 0
 19235  19236  19237  672 -19239 0
 19235  19236  19237  672  19240 0

c  -1-1 --> -2
c    ( b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧  b^{96, 7}_0 ∧ -p_672) -> ( b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0)
c  in CNF:
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨  b^{96, 8}_2
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨  b^{96, 8}_1
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨  p_672 ∨ -b^{96, 8}_0
c  in DIMACS:
-19235  19236 -19237  672  19238 0
-19235  19236 -19237  672  19239 0
-19235  19236 -19237  672 -19240 0

c  -2-1 --> break 
c    ( b^{96, 7}_2 ∧  b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨  b^{96, 7}_0 ∨  p_672 ∨ break
c  in DIMACS:
-19235 -19236  19237  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 7}_2 ∧ -b^{96, 7}_1 ∧ -b^{96, 7}_0 ∧ true) 
c  in CNF:
c    -b^{96, 7}_2 ∨  b^{96, 7}_1 ∨  b^{96, 7}_0 ∨ false 
c  in DIMACS:
-19235  19236  19237  0

c  3 does not represent an automaton state.
c    -(-b^{96, 7}_2 ∧  b^{96, 7}_1 ∧  b^{96, 7}_0 ∧ true) 
c  in CNF:
c     b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ false 
c  in DIMACS:
 19235 -19236 -19237  0
c  -3 does not represent an automaton state.
c    -( b^{96, 7}_2 ∧  b^{96, 7}_1 ∧  b^{96, 7}_0 ∧ true) 
c  in CNF:
c    -b^{96, 7}_2 ∨ -b^{96, 7}_1 ∨ -b^{96, 7}_0 ∨ false 
c  in DIMACS:
-19235 -19236 -19237  0

c i = 8
c  -2+1 --> -1
c    ( b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧  p_768) -> ( b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0)
c  in CNF:
c    -b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨  b^{96, 9}_2
c    -b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_1
c    -b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨  b^{96, 9}_0
c  in DIMACS:
-19238 -19239  19240 -768  19241 0
-19238 -19239  19240 -768 -19242 0
-19238 -19239  19240 -768  19243 0

c  -1+1 --> 0
c    ( b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0 ∧  p_768) -> (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧ -b^{96, 9}_0)
c  in CNF:
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_2
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_1
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_0
c  in DIMACS:
-19238  19239 -19240 -768 -19241 0
-19238  19239 -19240 -768 -19242 0
-19238  19239 -19240 -768 -19243 0

c  0+1 --> 1
c    (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧  p_768) -> (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0)
c  in CNF:
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_2
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_1
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨  b^{96, 9}_0
c  in DIMACS:
 19238  19239  19240 -768 -19241 0
 19238  19239  19240 -768 -19242 0
 19238  19239  19240 -768  19243 0

c  1+1 --> 2
c    (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0 ∧  p_768) -> (-b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0)
c  in CNF:
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_2
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨  b^{96, 9}_1
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ -p_768 ∨ -b^{96, 9}_0
c  in DIMACS:
 19238  19239 -19240 -768 -19241 0
 19238  19239 -19240 -768  19242 0
 19238  19239 -19240 -768 -19243 0

c  2+1 --> break 
c    (-b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧  p_768) -> break
c  in CNF:
c     b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 19238 -19239  19240 -768 1162 0


c  2-1 --> 1
c    (-b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧ -p_768) -> (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0)
c  in CNF:
c     b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_2
c     b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_1
c     b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨  b^{96, 9}_0
c  in DIMACS:
 19238 -19239  19240  768 -19241 0
 19238 -19239  19240  768 -19242 0
 19238 -19239  19240  768  19243 0

c  1-1 --> 0
c    (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0 ∧ -p_768) -> (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧ -b^{96, 9}_0)
c  in CNF:
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_2
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_1
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_0
c  in DIMACS:
 19238  19239 -19240  768 -19241 0
 19238  19239 -19240  768 -19242 0
 19238  19239 -19240  768 -19243 0

c  0-1 --> -1
c    (-b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧ -p_768) -> ( b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0)
c  in CNF:
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨  b^{96, 9}_2
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_1
c     b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨  b^{96, 9}_0
c  in DIMACS:
 19238  19239  19240  768  19241 0
 19238  19239  19240  768 -19242 0
 19238  19239  19240  768  19243 0

c  -1-1 --> -2
c    ( b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧  b^{96, 8}_0 ∧ -p_768) -> ( b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0)
c  in CNF:
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨  b^{96, 9}_2
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨  b^{96, 9}_1
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨  p_768 ∨ -b^{96, 9}_0
c  in DIMACS:
-19238  19239 -19240  768  19241 0
-19238  19239 -19240  768  19242 0
-19238  19239 -19240  768 -19243 0

c  -2-1 --> break 
c    ( b^{96, 8}_2 ∧  b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨  b^{96, 8}_0 ∨  p_768 ∨ break
c  in DIMACS:
-19238 -19239  19240  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 8}_2 ∧ -b^{96, 8}_1 ∧ -b^{96, 8}_0 ∧ true) 
c  in CNF:
c    -b^{96, 8}_2 ∨  b^{96, 8}_1 ∨  b^{96, 8}_0 ∨ false 
c  in DIMACS:
-19238  19239  19240  0

c  3 does not represent an automaton state.
c    -(-b^{96, 8}_2 ∧  b^{96, 8}_1 ∧  b^{96, 8}_0 ∧ true) 
c  in CNF:
c     b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ false 
c  in DIMACS:
 19238 -19239 -19240  0
c  -3 does not represent an automaton state.
c    -( b^{96, 8}_2 ∧  b^{96, 8}_1 ∧  b^{96, 8}_0 ∧ true) 
c  in CNF:
c    -b^{96, 8}_2 ∨ -b^{96, 8}_1 ∨ -b^{96, 8}_0 ∨ false 
c  in DIMACS:
-19238 -19239 -19240  0

c i = 9
c  -2+1 --> -1
c    ( b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧  p_864) -> ( b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0)
c  in CNF:
c    -b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨  b^{96, 10}_2
c    -b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_1
c    -b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨  b^{96, 10}_0
c  in DIMACS:
-19241 -19242  19243 -864  19244 0
-19241 -19242  19243 -864 -19245 0
-19241 -19242  19243 -864  19246 0

c  -1+1 --> 0
c    ( b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0 ∧  p_864) -> (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧ -b^{96, 10}_0)
c  in CNF:
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_2
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_1
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_0
c  in DIMACS:
-19241  19242 -19243 -864 -19244 0
-19241  19242 -19243 -864 -19245 0
-19241  19242 -19243 -864 -19246 0

c  0+1 --> 1
c    (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧  p_864) -> (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0)
c  in CNF:
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_2
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_1
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨  b^{96, 10}_0
c  in DIMACS:
 19241  19242  19243 -864 -19244 0
 19241  19242  19243 -864 -19245 0
 19241  19242  19243 -864  19246 0

c  1+1 --> 2
c    (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0 ∧  p_864) -> (-b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0)
c  in CNF:
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_2
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨  b^{96, 10}_1
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ -p_864 ∨ -b^{96, 10}_0
c  in DIMACS:
 19241  19242 -19243 -864 -19244 0
 19241  19242 -19243 -864  19245 0
 19241  19242 -19243 -864 -19246 0

c  2+1 --> break 
c    (-b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧  p_864) -> break
c  in CNF:
c     b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 19241 -19242  19243 -864 1162 0


c  2-1 --> 1
c    (-b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧ -p_864) -> (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0)
c  in CNF:
c     b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_2
c     b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_1
c     b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨  b^{96, 10}_0
c  in DIMACS:
 19241 -19242  19243  864 -19244 0
 19241 -19242  19243  864 -19245 0
 19241 -19242  19243  864  19246 0

c  1-1 --> 0
c    (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0 ∧ -p_864) -> (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧ -b^{96, 10}_0)
c  in CNF:
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_2
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_1
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_0
c  in DIMACS:
 19241  19242 -19243  864 -19244 0
 19241  19242 -19243  864 -19245 0
 19241  19242 -19243  864 -19246 0

c  0-1 --> -1
c    (-b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧ -p_864) -> ( b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0)
c  in CNF:
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨  b^{96, 10}_2
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_1
c     b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨  b^{96, 10}_0
c  in DIMACS:
 19241  19242  19243  864  19244 0
 19241  19242  19243  864 -19245 0
 19241  19242  19243  864  19246 0

c  -1-1 --> -2
c    ( b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧  b^{96, 9}_0 ∧ -p_864) -> ( b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0)
c  in CNF:
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨  b^{96, 10}_2
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨  b^{96, 10}_1
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨  p_864 ∨ -b^{96, 10}_0
c  in DIMACS:
-19241  19242 -19243  864  19244 0
-19241  19242 -19243  864  19245 0
-19241  19242 -19243  864 -19246 0

c  -2-1 --> break 
c    ( b^{96, 9}_2 ∧  b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨  b^{96, 9}_0 ∨  p_864 ∨ break
c  in DIMACS:
-19241 -19242  19243  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 9}_2 ∧ -b^{96, 9}_1 ∧ -b^{96, 9}_0 ∧ true) 
c  in CNF:
c    -b^{96, 9}_2 ∨  b^{96, 9}_1 ∨  b^{96, 9}_0 ∨ false 
c  in DIMACS:
-19241  19242  19243  0

c  3 does not represent an automaton state.
c    -(-b^{96, 9}_2 ∧  b^{96, 9}_1 ∧  b^{96, 9}_0 ∧ true) 
c  in CNF:
c     b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ false 
c  in DIMACS:
 19241 -19242 -19243  0
c  -3 does not represent an automaton state.
c    -( b^{96, 9}_2 ∧  b^{96, 9}_1 ∧  b^{96, 9}_0 ∧ true) 
c  in CNF:
c    -b^{96, 9}_2 ∨ -b^{96, 9}_1 ∨ -b^{96, 9}_0 ∨ false 
c  in DIMACS:
-19241 -19242 -19243  0

c i = 10
c  -2+1 --> -1
c    ( b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧  p_960) -> ( b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0)
c  in CNF:
c    -b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨  b^{96, 11}_2
c    -b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_1
c    -b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨  b^{96, 11}_0
c  in DIMACS:
-19244 -19245  19246 -960  19247 0
-19244 -19245  19246 -960 -19248 0
-19244 -19245  19246 -960  19249 0

c  -1+1 --> 0
c    ( b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0 ∧  p_960) -> (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧ -b^{96, 11}_0)
c  in CNF:
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_2
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_1
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_0
c  in DIMACS:
-19244  19245 -19246 -960 -19247 0
-19244  19245 -19246 -960 -19248 0
-19244  19245 -19246 -960 -19249 0

c  0+1 --> 1
c    (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧  p_960) -> (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0)
c  in CNF:
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_2
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_1
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨  b^{96, 11}_0
c  in DIMACS:
 19244  19245  19246 -960 -19247 0
 19244  19245  19246 -960 -19248 0
 19244  19245  19246 -960  19249 0

c  1+1 --> 2
c    (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0 ∧  p_960) -> (-b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0)
c  in CNF:
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_2
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨  b^{96, 11}_1
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ -p_960 ∨ -b^{96, 11}_0
c  in DIMACS:
 19244  19245 -19246 -960 -19247 0
 19244  19245 -19246 -960  19248 0
 19244  19245 -19246 -960 -19249 0

c  2+1 --> break 
c    (-b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧  p_960) -> break
c  in CNF:
c     b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 19244 -19245  19246 -960 1162 0


c  2-1 --> 1
c    (-b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧ -p_960) -> (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0)
c  in CNF:
c     b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_2
c     b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_1
c     b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨  b^{96, 11}_0
c  in DIMACS:
 19244 -19245  19246  960 -19247 0
 19244 -19245  19246  960 -19248 0
 19244 -19245  19246  960  19249 0

c  1-1 --> 0
c    (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0 ∧ -p_960) -> (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧ -b^{96, 11}_0)
c  in CNF:
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_2
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_1
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_0
c  in DIMACS:
 19244  19245 -19246  960 -19247 0
 19244  19245 -19246  960 -19248 0
 19244  19245 -19246  960 -19249 0

c  0-1 --> -1
c    (-b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧ -p_960) -> ( b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0)
c  in CNF:
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨  b^{96, 11}_2
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_1
c     b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨  b^{96, 11}_0
c  in DIMACS:
 19244  19245  19246  960  19247 0
 19244  19245  19246  960 -19248 0
 19244  19245  19246  960  19249 0

c  -1-1 --> -2
c    ( b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧  b^{96, 10}_0 ∧ -p_960) -> ( b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0)
c  in CNF:
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨  b^{96, 11}_2
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨  b^{96, 11}_1
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨  p_960 ∨ -b^{96, 11}_0
c  in DIMACS:
-19244  19245 -19246  960  19247 0
-19244  19245 -19246  960  19248 0
-19244  19245 -19246  960 -19249 0

c  -2-1 --> break 
c    ( b^{96, 10}_2 ∧  b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨  b^{96, 10}_0 ∨  p_960 ∨ break
c  in DIMACS:
-19244 -19245  19246  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 10}_2 ∧ -b^{96, 10}_1 ∧ -b^{96, 10}_0 ∧ true) 
c  in CNF:
c    -b^{96, 10}_2 ∨  b^{96, 10}_1 ∨  b^{96, 10}_0 ∨ false 
c  in DIMACS:
-19244  19245  19246  0

c  3 does not represent an automaton state.
c    -(-b^{96, 10}_2 ∧  b^{96, 10}_1 ∧  b^{96, 10}_0 ∧ true) 
c  in CNF:
c     b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ false 
c  in DIMACS:
 19244 -19245 -19246  0
c  -3 does not represent an automaton state.
c    -( b^{96, 10}_2 ∧  b^{96, 10}_1 ∧  b^{96, 10}_0 ∧ true) 
c  in CNF:
c    -b^{96, 10}_2 ∨ -b^{96, 10}_1 ∨ -b^{96, 10}_0 ∨ false 
c  in DIMACS:
-19244 -19245 -19246  0

c i = 11
c  -2+1 --> -1
c    ( b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧  p_1056) -> ( b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0)
c  in CNF:
c    -b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨  b^{96, 12}_2
c    -b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_1
c    -b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨  b^{96, 12}_0
c  in DIMACS:
-19247 -19248  19249 -1056  19250 0
-19247 -19248  19249 -1056 -19251 0
-19247 -19248  19249 -1056  19252 0

c  -1+1 --> 0
c    ( b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0 ∧  p_1056) -> (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧ -b^{96, 12}_0)
c  in CNF:
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_2
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_1
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_0
c  in DIMACS:
-19247  19248 -19249 -1056 -19250 0
-19247  19248 -19249 -1056 -19251 0
-19247  19248 -19249 -1056 -19252 0

c  0+1 --> 1
c    (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧  p_1056) -> (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0)
c  in CNF:
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_2
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_1
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨  b^{96, 12}_0
c  in DIMACS:
 19247  19248  19249 -1056 -19250 0
 19247  19248  19249 -1056 -19251 0
 19247  19248  19249 -1056  19252 0

c  1+1 --> 2
c    (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0 ∧  p_1056) -> (-b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0)
c  in CNF:
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_2
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨  b^{96, 12}_1
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ -p_1056 ∨ -b^{96, 12}_0
c  in DIMACS:
 19247  19248 -19249 -1056 -19250 0
 19247  19248 -19249 -1056  19251 0
 19247  19248 -19249 -1056 -19252 0

c  2+1 --> break 
c    (-b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 19247 -19248  19249 -1056 1162 0


c  2-1 --> 1
c    (-b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧ -p_1056) -> (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0)
c  in CNF:
c     b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_2
c     b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_1
c     b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨  b^{96, 12}_0
c  in DIMACS:
 19247 -19248  19249  1056 -19250 0
 19247 -19248  19249  1056 -19251 0
 19247 -19248  19249  1056  19252 0

c  1-1 --> 0
c    (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0 ∧ -p_1056) -> (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧ -b^{96, 12}_0)
c  in CNF:
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_2
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_1
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_0
c  in DIMACS:
 19247  19248 -19249  1056 -19250 0
 19247  19248 -19249  1056 -19251 0
 19247  19248 -19249  1056 -19252 0

c  0-1 --> -1
c    (-b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧ -p_1056) -> ( b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0)
c  in CNF:
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨  b^{96, 12}_2
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_1
c     b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨  b^{96, 12}_0
c  in DIMACS:
 19247  19248  19249  1056  19250 0
 19247  19248  19249  1056 -19251 0
 19247  19248  19249  1056  19252 0

c  -1-1 --> -2
c    ( b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧  b^{96, 11}_0 ∧ -p_1056) -> ( b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0)
c  in CNF:
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨  b^{96, 12}_2
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨  b^{96, 12}_1
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨  p_1056 ∨ -b^{96, 12}_0
c  in DIMACS:
-19247  19248 -19249  1056  19250 0
-19247  19248 -19249  1056  19251 0
-19247  19248 -19249  1056 -19252 0

c  -2-1 --> break 
c    ( b^{96, 11}_2 ∧  b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨  b^{96, 11}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-19247 -19248  19249  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 11}_2 ∧ -b^{96, 11}_1 ∧ -b^{96, 11}_0 ∧ true) 
c  in CNF:
c    -b^{96, 11}_2 ∨  b^{96, 11}_1 ∨  b^{96, 11}_0 ∨ false 
c  in DIMACS:
-19247  19248  19249  0

c  3 does not represent an automaton state.
c    -(-b^{96, 11}_2 ∧  b^{96, 11}_1 ∧  b^{96, 11}_0 ∧ true) 
c  in CNF:
c     b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ false 
c  in DIMACS:
 19247 -19248 -19249  0
c  -3 does not represent an automaton state.
c    -( b^{96, 11}_2 ∧  b^{96, 11}_1 ∧  b^{96, 11}_0 ∧ true) 
c  in CNF:
c    -b^{96, 11}_2 ∨ -b^{96, 11}_1 ∨ -b^{96, 11}_0 ∨ false 
c  in DIMACS:
-19247 -19248 -19249  0

c i = 12
c  -2+1 --> -1
c    ( b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧  p_1152) -> ( b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧  b^{96, 13}_0)
c  in CNF:
c    -b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨  b^{96, 13}_2
c    -b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_1
c    -b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨  b^{96, 13}_0
c  in DIMACS:
-19250 -19251  19252 -1152  19253 0
-19250 -19251  19252 -1152 -19254 0
-19250 -19251  19252 -1152  19255 0

c  -1+1 --> 0
c    ( b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0 ∧  p_1152) -> (-b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧ -b^{96, 13}_0)
c  in CNF:
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_2
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_1
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_0
c  in DIMACS:
-19250  19251 -19252 -1152 -19253 0
-19250  19251 -19252 -1152 -19254 0
-19250  19251 -19252 -1152 -19255 0

c  0+1 --> 1
c    (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧  p_1152) -> (-b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧  b^{96, 13}_0)
c  in CNF:
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_2
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_1
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨  b^{96, 13}_0
c  in DIMACS:
 19250  19251  19252 -1152 -19253 0
 19250  19251  19252 -1152 -19254 0
 19250  19251  19252 -1152  19255 0

c  1+1 --> 2
c    (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0 ∧  p_1152) -> (-b^{96, 13}_2 ∧  b^{96, 13}_1 ∧ -b^{96, 13}_0)
c  in CNF:
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_2
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨  b^{96, 13}_1
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ -p_1152 ∨ -b^{96, 13}_0
c  in DIMACS:
 19250  19251 -19252 -1152 -19253 0
 19250  19251 -19252 -1152  19254 0
 19250  19251 -19252 -1152 -19255 0

c  2+1 --> break 
c    (-b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 19250 -19251  19252 -1152 1162 0


c  2-1 --> 1
c    (-b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧ -p_1152) -> (-b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧  b^{96, 13}_0)
c  in CNF:
c     b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_2
c     b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_1
c     b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨  b^{96, 13}_0
c  in DIMACS:
 19250 -19251  19252  1152 -19253 0
 19250 -19251  19252  1152 -19254 0
 19250 -19251  19252  1152  19255 0

c  1-1 --> 0
c    (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0 ∧ -p_1152) -> (-b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧ -b^{96, 13}_0)
c  in CNF:
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_2
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_1
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_0
c  in DIMACS:
 19250  19251 -19252  1152 -19253 0
 19250  19251 -19252  1152 -19254 0
 19250  19251 -19252  1152 -19255 0

c  0-1 --> -1
c    (-b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧ -p_1152) -> ( b^{96, 13}_2 ∧ -b^{96, 13}_1 ∧  b^{96, 13}_0)
c  in CNF:
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨  b^{96, 13}_2
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_1
c     b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨  b^{96, 13}_0
c  in DIMACS:
 19250  19251  19252  1152  19253 0
 19250  19251  19252  1152 -19254 0
 19250  19251  19252  1152  19255 0

c  -1-1 --> -2
c    ( b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧  b^{96, 12}_0 ∧ -p_1152) -> ( b^{96, 13}_2 ∧  b^{96, 13}_1 ∧ -b^{96, 13}_0)
c  in CNF:
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨  b^{96, 13}_2
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨  b^{96, 13}_1
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨  p_1152 ∨ -b^{96, 13}_0
c  in DIMACS:
-19250  19251 -19252  1152  19253 0
-19250  19251 -19252  1152  19254 0
-19250  19251 -19252  1152 -19255 0

c  -2-1 --> break 
c    ( b^{96, 12}_2 ∧  b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨  b^{96, 12}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-19250 -19251  19252  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{96, 12}_2 ∧ -b^{96, 12}_1 ∧ -b^{96, 12}_0 ∧ true) 
c  in CNF:
c    -b^{96, 12}_2 ∨  b^{96, 12}_1 ∨  b^{96, 12}_0 ∨ false 
c  in DIMACS:
-19250  19251  19252  0

c  3 does not represent an automaton state.
c    -(-b^{96, 12}_2 ∧  b^{96, 12}_1 ∧  b^{96, 12}_0 ∧ true) 
c  in CNF:
c     b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ false 
c  in DIMACS:
 19250 -19251 -19252  0
c  -3 does not represent an automaton state.
c    -( b^{96, 12}_2 ∧  b^{96, 12}_1 ∧  b^{96, 12}_0 ∧ true) 
c  in CNF:
c    -b^{96, 12}_2 ∨ -b^{96, 12}_1 ∨ -b^{96, 12}_0 ∨ false 
c  in DIMACS:
-19250 -19251 -19252  0

c INIT for k = 97
c    -b^{97, 1}_2
c    -b^{97, 1}_1
c    -b^{97, 1}_0
c  in DIMACS:
-19256 0
-19257 0
-19258 0

c Transitions for k = 97
c i = 1
c  -2+1 --> -1
c    ( b^{97, 1}_2 ∧  b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧  p_97) -> ( b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0)
c  in CNF:
c    -b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨  b^{97, 2}_2
c    -b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_1
c    -b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨  b^{97, 2}_0
c  in DIMACS:
-19256 -19257  19258 -97  19259 0
-19256 -19257  19258 -97 -19260 0
-19256 -19257  19258 -97  19261 0

c  -1+1 --> 0
c    ( b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧  b^{97, 1}_0 ∧  p_97) -> (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧ -b^{97, 2}_0)
c  in CNF:
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_2
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_1
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_0
c  in DIMACS:
-19256  19257 -19258 -97 -19259 0
-19256  19257 -19258 -97 -19260 0
-19256  19257 -19258 -97 -19261 0

c  0+1 --> 1
c    (-b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧  p_97) -> (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0)
c  in CNF:
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_2
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_1
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨  b^{97, 2}_0
c  in DIMACS:
 19256  19257  19258 -97 -19259 0
 19256  19257  19258 -97 -19260 0
 19256  19257  19258 -97  19261 0

c  1+1 --> 2
c    (-b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧  b^{97, 1}_0 ∧  p_97) -> (-b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0)
c  in CNF:
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_2
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨  b^{97, 2}_1
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ -p_97 ∨ -b^{97, 2}_0
c  in DIMACS:
 19256  19257 -19258 -97 -19259 0
 19256  19257 -19258 -97  19260 0
 19256  19257 -19258 -97 -19261 0

c  2+1 --> break 
c    (-b^{97, 1}_2 ∧  b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧  p_97) -> break
c  in CNF:
c     b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ -p_97 ∨ break
c  in DIMACS:
 19256 -19257  19258 -97 1162 0


c  2-1 --> 1
c    (-b^{97, 1}_2 ∧  b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧ -p_97) -> (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0)
c  in CNF:
c     b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_2
c     b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_1
c     b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨  b^{97, 2}_0
c  in DIMACS:
 19256 -19257  19258  97 -19259 0
 19256 -19257  19258  97 -19260 0
 19256 -19257  19258  97  19261 0

c  1-1 --> 0
c    (-b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧  b^{97, 1}_0 ∧ -p_97) -> (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧ -b^{97, 2}_0)
c  in CNF:
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_2
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_1
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_0
c  in DIMACS:
 19256  19257 -19258  97 -19259 0
 19256  19257 -19258  97 -19260 0
 19256  19257 -19258  97 -19261 0

c  0-1 --> -1
c    (-b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧ -p_97) -> ( b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0)
c  in CNF:
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨  b^{97, 2}_2
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_1
c     b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨  b^{97, 2}_0
c  in DIMACS:
 19256  19257  19258  97  19259 0
 19256  19257  19258  97 -19260 0
 19256  19257  19258  97  19261 0

c  -1-1 --> -2
c    ( b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧  b^{97, 1}_0 ∧ -p_97) -> ( b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0)
c  in CNF:
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨  b^{97, 2}_2
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨  b^{97, 2}_1
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨  p_97 ∨ -b^{97, 2}_0
c  in DIMACS:
-19256  19257 -19258  97  19259 0
-19256  19257 -19258  97  19260 0
-19256  19257 -19258  97 -19261 0

c  -2-1 --> break 
c    ( b^{97, 1}_2 ∧  b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧ -p_97) -> break
c  in CNF:
c    -b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨  b^{97, 1}_0 ∨  p_97 ∨ break
c  in DIMACS:
-19256 -19257  19258  97 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 1}_2 ∧ -b^{97, 1}_1 ∧ -b^{97, 1}_0 ∧ true) 
c  in CNF:
c    -b^{97, 1}_2 ∨  b^{97, 1}_1 ∨  b^{97, 1}_0 ∨ false 
c  in DIMACS:
-19256  19257  19258  0

c  3 does not represent an automaton state.
c    -(-b^{97, 1}_2 ∧  b^{97, 1}_1 ∧  b^{97, 1}_0 ∧ true) 
c  in CNF:
c     b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ false 
c  in DIMACS:
 19256 -19257 -19258  0
c  -3 does not represent an automaton state.
c    -( b^{97, 1}_2 ∧  b^{97, 1}_1 ∧  b^{97, 1}_0 ∧ true) 
c  in CNF:
c    -b^{97, 1}_2 ∨ -b^{97, 1}_1 ∨ -b^{97, 1}_0 ∨ false 
c  in DIMACS:
-19256 -19257 -19258  0

c i = 2
c  -2+1 --> -1
c    ( b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧  p_194) -> ( b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0)
c  in CNF:
c    -b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨  b^{97, 3}_2
c    -b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_1
c    -b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨  b^{97, 3}_0
c  in DIMACS:
-19259 -19260  19261 -194  19262 0
-19259 -19260  19261 -194 -19263 0
-19259 -19260  19261 -194  19264 0

c  -1+1 --> 0
c    ( b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0 ∧  p_194) -> (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧ -b^{97, 3}_0)
c  in CNF:
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_2
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_1
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_0
c  in DIMACS:
-19259  19260 -19261 -194 -19262 0
-19259  19260 -19261 -194 -19263 0
-19259  19260 -19261 -194 -19264 0

c  0+1 --> 1
c    (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧  p_194) -> (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0)
c  in CNF:
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_2
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_1
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨  b^{97, 3}_0
c  in DIMACS:
 19259  19260  19261 -194 -19262 0
 19259  19260  19261 -194 -19263 0
 19259  19260  19261 -194  19264 0

c  1+1 --> 2
c    (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0 ∧  p_194) -> (-b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0)
c  in CNF:
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_2
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨  b^{97, 3}_1
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ -p_194 ∨ -b^{97, 3}_0
c  in DIMACS:
 19259  19260 -19261 -194 -19262 0
 19259  19260 -19261 -194  19263 0
 19259  19260 -19261 -194 -19264 0

c  2+1 --> break 
c    (-b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧  p_194) -> break
c  in CNF:
c     b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ -p_194 ∨ break
c  in DIMACS:
 19259 -19260  19261 -194 1162 0


c  2-1 --> 1
c    (-b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧ -p_194) -> (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0)
c  in CNF:
c     b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_2
c     b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_1
c     b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨  b^{97, 3}_0
c  in DIMACS:
 19259 -19260  19261  194 -19262 0
 19259 -19260  19261  194 -19263 0
 19259 -19260  19261  194  19264 0

c  1-1 --> 0
c    (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0 ∧ -p_194) -> (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧ -b^{97, 3}_0)
c  in CNF:
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_2
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_1
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_0
c  in DIMACS:
 19259  19260 -19261  194 -19262 0
 19259  19260 -19261  194 -19263 0
 19259  19260 -19261  194 -19264 0

c  0-1 --> -1
c    (-b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧ -p_194) -> ( b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0)
c  in CNF:
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨  b^{97, 3}_2
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_1
c     b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨  b^{97, 3}_0
c  in DIMACS:
 19259  19260  19261  194  19262 0
 19259  19260  19261  194 -19263 0
 19259  19260  19261  194  19264 0

c  -1-1 --> -2
c    ( b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧  b^{97, 2}_0 ∧ -p_194) -> ( b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0)
c  in CNF:
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨  b^{97, 3}_2
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨  b^{97, 3}_1
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨  p_194 ∨ -b^{97, 3}_0
c  in DIMACS:
-19259  19260 -19261  194  19262 0
-19259  19260 -19261  194  19263 0
-19259  19260 -19261  194 -19264 0

c  -2-1 --> break 
c    ( b^{97, 2}_2 ∧  b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧ -p_194) -> break
c  in CNF:
c    -b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨  b^{97, 2}_0 ∨  p_194 ∨ break
c  in DIMACS:
-19259 -19260  19261  194 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 2}_2 ∧ -b^{97, 2}_1 ∧ -b^{97, 2}_0 ∧ true) 
c  in CNF:
c    -b^{97, 2}_2 ∨  b^{97, 2}_1 ∨  b^{97, 2}_0 ∨ false 
c  in DIMACS:
-19259  19260  19261  0

c  3 does not represent an automaton state.
c    -(-b^{97, 2}_2 ∧  b^{97, 2}_1 ∧  b^{97, 2}_0 ∧ true) 
c  in CNF:
c     b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ false 
c  in DIMACS:
 19259 -19260 -19261  0
c  -3 does not represent an automaton state.
c    -( b^{97, 2}_2 ∧  b^{97, 2}_1 ∧  b^{97, 2}_0 ∧ true) 
c  in CNF:
c    -b^{97, 2}_2 ∨ -b^{97, 2}_1 ∨ -b^{97, 2}_0 ∨ false 
c  in DIMACS:
-19259 -19260 -19261  0

c i = 3
c  -2+1 --> -1
c    ( b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧  p_291) -> ( b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0)
c  in CNF:
c    -b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨  b^{97, 4}_2
c    -b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_1
c    -b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨  b^{97, 4}_0
c  in DIMACS:
-19262 -19263  19264 -291  19265 0
-19262 -19263  19264 -291 -19266 0
-19262 -19263  19264 -291  19267 0

c  -1+1 --> 0
c    ( b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0 ∧  p_291) -> (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧ -b^{97, 4}_0)
c  in CNF:
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_2
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_1
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_0
c  in DIMACS:
-19262  19263 -19264 -291 -19265 0
-19262  19263 -19264 -291 -19266 0
-19262  19263 -19264 -291 -19267 0

c  0+1 --> 1
c    (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧  p_291) -> (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0)
c  in CNF:
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_2
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_1
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨  b^{97, 4}_0
c  in DIMACS:
 19262  19263  19264 -291 -19265 0
 19262  19263  19264 -291 -19266 0
 19262  19263  19264 -291  19267 0

c  1+1 --> 2
c    (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0 ∧  p_291) -> (-b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0)
c  in CNF:
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_2
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨  b^{97, 4}_1
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ -p_291 ∨ -b^{97, 4}_0
c  in DIMACS:
 19262  19263 -19264 -291 -19265 0
 19262  19263 -19264 -291  19266 0
 19262  19263 -19264 -291 -19267 0

c  2+1 --> break 
c    (-b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧  p_291) -> break
c  in CNF:
c     b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ -p_291 ∨ break
c  in DIMACS:
 19262 -19263  19264 -291 1162 0


c  2-1 --> 1
c    (-b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧ -p_291) -> (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0)
c  in CNF:
c     b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_2
c     b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_1
c     b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨  b^{97, 4}_0
c  in DIMACS:
 19262 -19263  19264  291 -19265 0
 19262 -19263  19264  291 -19266 0
 19262 -19263  19264  291  19267 0

c  1-1 --> 0
c    (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0 ∧ -p_291) -> (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧ -b^{97, 4}_0)
c  in CNF:
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_2
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_1
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_0
c  in DIMACS:
 19262  19263 -19264  291 -19265 0
 19262  19263 -19264  291 -19266 0
 19262  19263 -19264  291 -19267 0

c  0-1 --> -1
c    (-b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧ -p_291) -> ( b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0)
c  in CNF:
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨  b^{97, 4}_2
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_1
c     b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨  b^{97, 4}_0
c  in DIMACS:
 19262  19263  19264  291  19265 0
 19262  19263  19264  291 -19266 0
 19262  19263  19264  291  19267 0

c  -1-1 --> -2
c    ( b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧  b^{97, 3}_0 ∧ -p_291) -> ( b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0)
c  in CNF:
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨  b^{97, 4}_2
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨  b^{97, 4}_1
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨  p_291 ∨ -b^{97, 4}_0
c  in DIMACS:
-19262  19263 -19264  291  19265 0
-19262  19263 -19264  291  19266 0
-19262  19263 -19264  291 -19267 0

c  -2-1 --> break 
c    ( b^{97, 3}_2 ∧  b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧ -p_291) -> break
c  in CNF:
c    -b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨  b^{97, 3}_0 ∨  p_291 ∨ break
c  in DIMACS:
-19262 -19263  19264  291 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 3}_2 ∧ -b^{97, 3}_1 ∧ -b^{97, 3}_0 ∧ true) 
c  in CNF:
c    -b^{97, 3}_2 ∨  b^{97, 3}_1 ∨  b^{97, 3}_0 ∨ false 
c  in DIMACS:
-19262  19263  19264  0

c  3 does not represent an automaton state.
c    -(-b^{97, 3}_2 ∧  b^{97, 3}_1 ∧  b^{97, 3}_0 ∧ true) 
c  in CNF:
c     b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ false 
c  in DIMACS:
 19262 -19263 -19264  0
c  -3 does not represent an automaton state.
c    -( b^{97, 3}_2 ∧  b^{97, 3}_1 ∧  b^{97, 3}_0 ∧ true) 
c  in CNF:
c    -b^{97, 3}_2 ∨ -b^{97, 3}_1 ∨ -b^{97, 3}_0 ∨ false 
c  in DIMACS:
-19262 -19263 -19264  0

c i = 4
c  -2+1 --> -1
c    ( b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧  p_388) -> ( b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0)
c  in CNF:
c    -b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨  b^{97, 5}_2
c    -b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_1
c    -b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨  b^{97, 5}_0
c  in DIMACS:
-19265 -19266  19267 -388  19268 0
-19265 -19266  19267 -388 -19269 0
-19265 -19266  19267 -388  19270 0

c  -1+1 --> 0
c    ( b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0 ∧  p_388) -> (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧ -b^{97, 5}_0)
c  in CNF:
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_2
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_1
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_0
c  in DIMACS:
-19265  19266 -19267 -388 -19268 0
-19265  19266 -19267 -388 -19269 0
-19265  19266 -19267 -388 -19270 0

c  0+1 --> 1
c    (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧  p_388) -> (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0)
c  in CNF:
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_2
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_1
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨  b^{97, 5}_0
c  in DIMACS:
 19265  19266  19267 -388 -19268 0
 19265  19266  19267 -388 -19269 0
 19265  19266  19267 -388  19270 0

c  1+1 --> 2
c    (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0 ∧  p_388) -> (-b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0)
c  in CNF:
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_2
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨  b^{97, 5}_1
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ -p_388 ∨ -b^{97, 5}_0
c  in DIMACS:
 19265  19266 -19267 -388 -19268 0
 19265  19266 -19267 -388  19269 0
 19265  19266 -19267 -388 -19270 0

c  2+1 --> break 
c    (-b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧  p_388) -> break
c  in CNF:
c     b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ -p_388 ∨ break
c  in DIMACS:
 19265 -19266  19267 -388 1162 0


c  2-1 --> 1
c    (-b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧ -p_388) -> (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0)
c  in CNF:
c     b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_2
c     b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_1
c     b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨  b^{97, 5}_0
c  in DIMACS:
 19265 -19266  19267  388 -19268 0
 19265 -19266  19267  388 -19269 0
 19265 -19266  19267  388  19270 0

c  1-1 --> 0
c    (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0 ∧ -p_388) -> (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧ -b^{97, 5}_0)
c  in CNF:
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_2
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_1
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_0
c  in DIMACS:
 19265  19266 -19267  388 -19268 0
 19265  19266 -19267  388 -19269 0
 19265  19266 -19267  388 -19270 0

c  0-1 --> -1
c    (-b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧ -p_388) -> ( b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0)
c  in CNF:
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨  b^{97, 5}_2
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_1
c     b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨  b^{97, 5}_0
c  in DIMACS:
 19265  19266  19267  388  19268 0
 19265  19266  19267  388 -19269 0
 19265  19266  19267  388  19270 0

c  -1-1 --> -2
c    ( b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧  b^{97, 4}_0 ∧ -p_388) -> ( b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0)
c  in CNF:
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨  b^{97, 5}_2
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨  b^{97, 5}_1
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨  p_388 ∨ -b^{97, 5}_0
c  in DIMACS:
-19265  19266 -19267  388  19268 0
-19265  19266 -19267  388  19269 0
-19265  19266 -19267  388 -19270 0

c  -2-1 --> break 
c    ( b^{97, 4}_2 ∧  b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧ -p_388) -> break
c  in CNF:
c    -b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨  b^{97, 4}_0 ∨  p_388 ∨ break
c  in DIMACS:
-19265 -19266  19267  388 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 4}_2 ∧ -b^{97, 4}_1 ∧ -b^{97, 4}_0 ∧ true) 
c  in CNF:
c    -b^{97, 4}_2 ∨  b^{97, 4}_1 ∨  b^{97, 4}_0 ∨ false 
c  in DIMACS:
-19265  19266  19267  0

c  3 does not represent an automaton state.
c    -(-b^{97, 4}_2 ∧  b^{97, 4}_1 ∧  b^{97, 4}_0 ∧ true) 
c  in CNF:
c     b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ false 
c  in DIMACS:
 19265 -19266 -19267  0
c  -3 does not represent an automaton state.
c    -( b^{97, 4}_2 ∧  b^{97, 4}_1 ∧  b^{97, 4}_0 ∧ true) 
c  in CNF:
c    -b^{97, 4}_2 ∨ -b^{97, 4}_1 ∨ -b^{97, 4}_0 ∨ false 
c  in DIMACS:
-19265 -19266 -19267  0

c i = 5
c  -2+1 --> -1
c    ( b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧  p_485) -> ( b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0)
c  in CNF:
c    -b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨  b^{97, 6}_2
c    -b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_1
c    -b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨  b^{97, 6}_0
c  in DIMACS:
-19268 -19269  19270 -485  19271 0
-19268 -19269  19270 -485 -19272 0
-19268 -19269  19270 -485  19273 0

c  -1+1 --> 0
c    ( b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0 ∧  p_485) -> (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧ -b^{97, 6}_0)
c  in CNF:
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_2
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_1
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_0
c  in DIMACS:
-19268  19269 -19270 -485 -19271 0
-19268  19269 -19270 -485 -19272 0
-19268  19269 -19270 -485 -19273 0

c  0+1 --> 1
c    (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧  p_485) -> (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0)
c  in CNF:
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_2
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_1
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨  b^{97, 6}_0
c  in DIMACS:
 19268  19269  19270 -485 -19271 0
 19268  19269  19270 -485 -19272 0
 19268  19269  19270 -485  19273 0

c  1+1 --> 2
c    (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0 ∧  p_485) -> (-b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0)
c  in CNF:
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_2
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨  b^{97, 6}_1
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ -p_485 ∨ -b^{97, 6}_0
c  in DIMACS:
 19268  19269 -19270 -485 -19271 0
 19268  19269 -19270 -485  19272 0
 19268  19269 -19270 -485 -19273 0

c  2+1 --> break 
c    (-b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧  p_485) -> break
c  in CNF:
c     b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ -p_485 ∨ break
c  in DIMACS:
 19268 -19269  19270 -485 1162 0


c  2-1 --> 1
c    (-b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧ -p_485) -> (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0)
c  in CNF:
c     b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_2
c     b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_1
c     b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨  b^{97, 6}_0
c  in DIMACS:
 19268 -19269  19270  485 -19271 0
 19268 -19269  19270  485 -19272 0
 19268 -19269  19270  485  19273 0

c  1-1 --> 0
c    (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0 ∧ -p_485) -> (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧ -b^{97, 6}_0)
c  in CNF:
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_2
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_1
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_0
c  in DIMACS:
 19268  19269 -19270  485 -19271 0
 19268  19269 -19270  485 -19272 0
 19268  19269 -19270  485 -19273 0

c  0-1 --> -1
c    (-b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧ -p_485) -> ( b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0)
c  in CNF:
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨  b^{97, 6}_2
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_1
c     b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨  b^{97, 6}_0
c  in DIMACS:
 19268  19269  19270  485  19271 0
 19268  19269  19270  485 -19272 0
 19268  19269  19270  485  19273 0

c  -1-1 --> -2
c    ( b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧  b^{97, 5}_0 ∧ -p_485) -> ( b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0)
c  in CNF:
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨  b^{97, 6}_2
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨  b^{97, 6}_1
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨  p_485 ∨ -b^{97, 6}_0
c  in DIMACS:
-19268  19269 -19270  485  19271 0
-19268  19269 -19270  485  19272 0
-19268  19269 -19270  485 -19273 0

c  -2-1 --> break 
c    ( b^{97, 5}_2 ∧  b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧ -p_485) -> break
c  in CNF:
c    -b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨  b^{97, 5}_0 ∨  p_485 ∨ break
c  in DIMACS:
-19268 -19269  19270  485 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 5}_2 ∧ -b^{97, 5}_1 ∧ -b^{97, 5}_0 ∧ true) 
c  in CNF:
c    -b^{97, 5}_2 ∨  b^{97, 5}_1 ∨  b^{97, 5}_0 ∨ false 
c  in DIMACS:
-19268  19269  19270  0

c  3 does not represent an automaton state.
c    -(-b^{97, 5}_2 ∧  b^{97, 5}_1 ∧  b^{97, 5}_0 ∧ true) 
c  in CNF:
c     b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ false 
c  in DIMACS:
 19268 -19269 -19270  0
c  -3 does not represent an automaton state.
c    -( b^{97, 5}_2 ∧  b^{97, 5}_1 ∧  b^{97, 5}_0 ∧ true) 
c  in CNF:
c    -b^{97, 5}_2 ∨ -b^{97, 5}_1 ∨ -b^{97, 5}_0 ∨ false 
c  in DIMACS:
-19268 -19269 -19270  0

c i = 6
c  -2+1 --> -1
c    ( b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧  p_582) -> ( b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0)
c  in CNF:
c    -b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨  b^{97, 7}_2
c    -b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_1
c    -b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨  b^{97, 7}_0
c  in DIMACS:
-19271 -19272  19273 -582  19274 0
-19271 -19272  19273 -582 -19275 0
-19271 -19272  19273 -582  19276 0

c  -1+1 --> 0
c    ( b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0 ∧  p_582) -> (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧ -b^{97, 7}_0)
c  in CNF:
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_2
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_1
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_0
c  in DIMACS:
-19271  19272 -19273 -582 -19274 0
-19271  19272 -19273 -582 -19275 0
-19271  19272 -19273 -582 -19276 0

c  0+1 --> 1
c    (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧  p_582) -> (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0)
c  in CNF:
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_2
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_1
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨  b^{97, 7}_0
c  in DIMACS:
 19271  19272  19273 -582 -19274 0
 19271  19272  19273 -582 -19275 0
 19271  19272  19273 -582  19276 0

c  1+1 --> 2
c    (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0 ∧  p_582) -> (-b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0)
c  in CNF:
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_2
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨  b^{97, 7}_1
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ -p_582 ∨ -b^{97, 7}_0
c  in DIMACS:
 19271  19272 -19273 -582 -19274 0
 19271  19272 -19273 -582  19275 0
 19271  19272 -19273 -582 -19276 0

c  2+1 --> break 
c    (-b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧  p_582) -> break
c  in CNF:
c     b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 19271 -19272  19273 -582 1162 0


c  2-1 --> 1
c    (-b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧ -p_582) -> (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0)
c  in CNF:
c     b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_2
c     b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_1
c     b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨  b^{97, 7}_0
c  in DIMACS:
 19271 -19272  19273  582 -19274 0
 19271 -19272  19273  582 -19275 0
 19271 -19272  19273  582  19276 0

c  1-1 --> 0
c    (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0 ∧ -p_582) -> (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧ -b^{97, 7}_0)
c  in CNF:
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_2
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_1
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_0
c  in DIMACS:
 19271  19272 -19273  582 -19274 0
 19271  19272 -19273  582 -19275 0
 19271  19272 -19273  582 -19276 0

c  0-1 --> -1
c    (-b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧ -p_582) -> ( b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0)
c  in CNF:
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨  b^{97, 7}_2
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_1
c     b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨  b^{97, 7}_0
c  in DIMACS:
 19271  19272  19273  582  19274 0
 19271  19272  19273  582 -19275 0
 19271  19272  19273  582  19276 0

c  -1-1 --> -2
c    ( b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧  b^{97, 6}_0 ∧ -p_582) -> ( b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0)
c  in CNF:
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨  b^{97, 7}_2
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨  b^{97, 7}_1
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨  p_582 ∨ -b^{97, 7}_0
c  in DIMACS:
-19271  19272 -19273  582  19274 0
-19271  19272 -19273  582  19275 0
-19271  19272 -19273  582 -19276 0

c  -2-1 --> break 
c    ( b^{97, 6}_2 ∧  b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨  b^{97, 6}_0 ∨  p_582 ∨ break
c  in DIMACS:
-19271 -19272  19273  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 6}_2 ∧ -b^{97, 6}_1 ∧ -b^{97, 6}_0 ∧ true) 
c  in CNF:
c    -b^{97, 6}_2 ∨  b^{97, 6}_1 ∨  b^{97, 6}_0 ∨ false 
c  in DIMACS:
-19271  19272  19273  0

c  3 does not represent an automaton state.
c    -(-b^{97, 6}_2 ∧  b^{97, 6}_1 ∧  b^{97, 6}_0 ∧ true) 
c  in CNF:
c     b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ false 
c  in DIMACS:
 19271 -19272 -19273  0
c  -3 does not represent an automaton state.
c    -( b^{97, 6}_2 ∧  b^{97, 6}_1 ∧  b^{97, 6}_0 ∧ true) 
c  in CNF:
c    -b^{97, 6}_2 ∨ -b^{97, 6}_1 ∨ -b^{97, 6}_0 ∨ false 
c  in DIMACS:
-19271 -19272 -19273  0

c i = 7
c  -2+1 --> -1
c    ( b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧  p_679) -> ( b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0)
c  in CNF:
c    -b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨  b^{97, 8}_2
c    -b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_1
c    -b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨  b^{97, 8}_0
c  in DIMACS:
-19274 -19275  19276 -679  19277 0
-19274 -19275  19276 -679 -19278 0
-19274 -19275  19276 -679  19279 0

c  -1+1 --> 0
c    ( b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0 ∧  p_679) -> (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧ -b^{97, 8}_0)
c  in CNF:
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_2
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_1
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_0
c  in DIMACS:
-19274  19275 -19276 -679 -19277 0
-19274  19275 -19276 -679 -19278 0
-19274  19275 -19276 -679 -19279 0

c  0+1 --> 1
c    (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧  p_679) -> (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0)
c  in CNF:
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_2
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_1
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨  b^{97, 8}_0
c  in DIMACS:
 19274  19275  19276 -679 -19277 0
 19274  19275  19276 -679 -19278 0
 19274  19275  19276 -679  19279 0

c  1+1 --> 2
c    (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0 ∧  p_679) -> (-b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0)
c  in CNF:
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_2
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨  b^{97, 8}_1
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ -p_679 ∨ -b^{97, 8}_0
c  in DIMACS:
 19274  19275 -19276 -679 -19277 0
 19274  19275 -19276 -679  19278 0
 19274  19275 -19276 -679 -19279 0

c  2+1 --> break 
c    (-b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧  p_679) -> break
c  in CNF:
c     b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ -p_679 ∨ break
c  in DIMACS:
 19274 -19275  19276 -679 1162 0


c  2-1 --> 1
c    (-b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧ -p_679) -> (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0)
c  in CNF:
c     b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_2
c     b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_1
c     b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨  b^{97, 8}_0
c  in DIMACS:
 19274 -19275  19276  679 -19277 0
 19274 -19275  19276  679 -19278 0
 19274 -19275  19276  679  19279 0

c  1-1 --> 0
c    (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0 ∧ -p_679) -> (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧ -b^{97, 8}_0)
c  in CNF:
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_2
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_1
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_0
c  in DIMACS:
 19274  19275 -19276  679 -19277 0
 19274  19275 -19276  679 -19278 0
 19274  19275 -19276  679 -19279 0

c  0-1 --> -1
c    (-b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧ -p_679) -> ( b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0)
c  in CNF:
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨  b^{97, 8}_2
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_1
c     b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨  b^{97, 8}_0
c  in DIMACS:
 19274  19275  19276  679  19277 0
 19274  19275  19276  679 -19278 0
 19274  19275  19276  679  19279 0

c  -1-1 --> -2
c    ( b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧  b^{97, 7}_0 ∧ -p_679) -> ( b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0)
c  in CNF:
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨  b^{97, 8}_2
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨  b^{97, 8}_1
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨  p_679 ∨ -b^{97, 8}_0
c  in DIMACS:
-19274  19275 -19276  679  19277 0
-19274  19275 -19276  679  19278 0
-19274  19275 -19276  679 -19279 0

c  -2-1 --> break 
c    ( b^{97, 7}_2 ∧  b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧ -p_679) -> break
c  in CNF:
c    -b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨  b^{97, 7}_0 ∨  p_679 ∨ break
c  in DIMACS:
-19274 -19275  19276  679 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 7}_2 ∧ -b^{97, 7}_1 ∧ -b^{97, 7}_0 ∧ true) 
c  in CNF:
c    -b^{97, 7}_2 ∨  b^{97, 7}_1 ∨  b^{97, 7}_0 ∨ false 
c  in DIMACS:
-19274  19275  19276  0

c  3 does not represent an automaton state.
c    -(-b^{97, 7}_2 ∧  b^{97, 7}_1 ∧  b^{97, 7}_0 ∧ true) 
c  in CNF:
c     b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ false 
c  in DIMACS:
 19274 -19275 -19276  0
c  -3 does not represent an automaton state.
c    -( b^{97, 7}_2 ∧  b^{97, 7}_1 ∧  b^{97, 7}_0 ∧ true) 
c  in CNF:
c    -b^{97, 7}_2 ∨ -b^{97, 7}_1 ∨ -b^{97, 7}_0 ∨ false 
c  in DIMACS:
-19274 -19275 -19276  0

c i = 8
c  -2+1 --> -1
c    ( b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧  p_776) -> ( b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0)
c  in CNF:
c    -b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨  b^{97, 9}_2
c    -b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_1
c    -b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨  b^{97, 9}_0
c  in DIMACS:
-19277 -19278  19279 -776  19280 0
-19277 -19278  19279 -776 -19281 0
-19277 -19278  19279 -776  19282 0

c  -1+1 --> 0
c    ( b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0 ∧  p_776) -> (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧ -b^{97, 9}_0)
c  in CNF:
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_2
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_1
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_0
c  in DIMACS:
-19277  19278 -19279 -776 -19280 0
-19277  19278 -19279 -776 -19281 0
-19277  19278 -19279 -776 -19282 0

c  0+1 --> 1
c    (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧  p_776) -> (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0)
c  in CNF:
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_2
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_1
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨  b^{97, 9}_0
c  in DIMACS:
 19277  19278  19279 -776 -19280 0
 19277  19278  19279 -776 -19281 0
 19277  19278  19279 -776  19282 0

c  1+1 --> 2
c    (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0 ∧  p_776) -> (-b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0)
c  in CNF:
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_2
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨  b^{97, 9}_1
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ -p_776 ∨ -b^{97, 9}_0
c  in DIMACS:
 19277  19278 -19279 -776 -19280 0
 19277  19278 -19279 -776  19281 0
 19277  19278 -19279 -776 -19282 0

c  2+1 --> break 
c    (-b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧  p_776) -> break
c  in CNF:
c     b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 19277 -19278  19279 -776 1162 0


c  2-1 --> 1
c    (-b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧ -p_776) -> (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0)
c  in CNF:
c     b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_2
c     b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_1
c     b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨  b^{97, 9}_0
c  in DIMACS:
 19277 -19278  19279  776 -19280 0
 19277 -19278  19279  776 -19281 0
 19277 -19278  19279  776  19282 0

c  1-1 --> 0
c    (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0 ∧ -p_776) -> (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧ -b^{97, 9}_0)
c  in CNF:
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_2
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_1
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_0
c  in DIMACS:
 19277  19278 -19279  776 -19280 0
 19277  19278 -19279  776 -19281 0
 19277  19278 -19279  776 -19282 0

c  0-1 --> -1
c    (-b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧ -p_776) -> ( b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0)
c  in CNF:
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨  b^{97, 9}_2
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_1
c     b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨  b^{97, 9}_0
c  in DIMACS:
 19277  19278  19279  776  19280 0
 19277  19278  19279  776 -19281 0
 19277  19278  19279  776  19282 0

c  -1-1 --> -2
c    ( b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧  b^{97, 8}_0 ∧ -p_776) -> ( b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0)
c  in CNF:
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨  b^{97, 9}_2
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨  b^{97, 9}_1
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨  p_776 ∨ -b^{97, 9}_0
c  in DIMACS:
-19277  19278 -19279  776  19280 0
-19277  19278 -19279  776  19281 0
-19277  19278 -19279  776 -19282 0

c  -2-1 --> break 
c    ( b^{97, 8}_2 ∧  b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨  b^{97, 8}_0 ∨  p_776 ∨ break
c  in DIMACS:
-19277 -19278  19279  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 8}_2 ∧ -b^{97, 8}_1 ∧ -b^{97, 8}_0 ∧ true) 
c  in CNF:
c    -b^{97, 8}_2 ∨  b^{97, 8}_1 ∨  b^{97, 8}_0 ∨ false 
c  in DIMACS:
-19277  19278  19279  0

c  3 does not represent an automaton state.
c    -(-b^{97, 8}_2 ∧  b^{97, 8}_1 ∧  b^{97, 8}_0 ∧ true) 
c  in CNF:
c     b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ false 
c  in DIMACS:
 19277 -19278 -19279  0
c  -3 does not represent an automaton state.
c    -( b^{97, 8}_2 ∧  b^{97, 8}_1 ∧  b^{97, 8}_0 ∧ true) 
c  in CNF:
c    -b^{97, 8}_2 ∨ -b^{97, 8}_1 ∨ -b^{97, 8}_0 ∨ false 
c  in DIMACS:
-19277 -19278 -19279  0

c i = 9
c  -2+1 --> -1
c    ( b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧  p_873) -> ( b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0)
c  in CNF:
c    -b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨  b^{97, 10}_2
c    -b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_1
c    -b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨  b^{97, 10}_0
c  in DIMACS:
-19280 -19281  19282 -873  19283 0
-19280 -19281  19282 -873 -19284 0
-19280 -19281  19282 -873  19285 0

c  -1+1 --> 0
c    ( b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0 ∧  p_873) -> (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧ -b^{97, 10}_0)
c  in CNF:
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_2
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_1
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_0
c  in DIMACS:
-19280  19281 -19282 -873 -19283 0
-19280  19281 -19282 -873 -19284 0
-19280  19281 -19282 -873 -19285 0

c  0+1 --> 1
c    (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧  p_873) -> (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0)
c  in CNF:
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_2
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_1
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨  b^{97, 10}_0
c  in DIMACS:
 19280  19281  19282 -873 -19283 0
 19280  19281  19282 -873 -19284 0
 19280  19281  19282 -873  19285 0

c  1+1 --> 2
c    (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0 ∧  p_873) -> (-b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0)
c  in CNF:
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_2
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨  b^{97, 10}_1
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ -p_873 ∨ -b^{97, 10}_0
c  in DIMACS:
 19280  19281 -19282 -873 -19283 0
 19280  19281 -19282 -873  19284 0
 19280  19281 -19282 -873 -19285 0

c  2+1 --> break 
c    (-b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧  p_873) -> break
c  in CNF:
c     b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ -p_873 ∨ break
c  in DIMACS:
 19280 -19281  19282 -873 1162 0


c  2-1 --> 1
c    (-b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧ -p_873) -> (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0)
c  in CNF:
c     b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_2
c     b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_1
c     b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨  b^{97, 10}_0
c  in DIMACS:
 19280 -19281  19282  873 -19283 0
 19280 -19281  19282  873 -19284 0
 19280 -19281  19282  873  19285 0

c  1-1 --> 0
c    (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0 ∧ -p_873) -> (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧ -b^{97, 10}_0)
c  in CNF:
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_2
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_1
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_0
c  in DIMACS:
 19280  19281 -19282  873 -19283 0
 19280  19281 -19282  873 -19284 0
 19280  19281 -19282  873 -19285 0

c  0-1 --> -1
c    (-b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧ -p_873) -> ( b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0)
c  in CNF:
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨  b^{97, 10}_2
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_1
c     b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨  b^{97, 10}_0
c  in DIMACS:
 19280  19281  19282  873  19283 0
 19280  19281  19282  873 -19284 0
 19280  19281  19282  873  19285 0

c  -1-1 --> -2
c    ( b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧  b^{97, 9}_0 ∧ -p_873) -> ( b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0)
c  in CNF:
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨  b^{97, 10}_2
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨  b^{97, 10}_1
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨  p_873 ∨ -b^{97, 10}_0
c  in DIMACS:
-19280  19281 -19282  873  19283 0
-19280  19281 -19282  873  19284 0
-19280  19281 -19282  873 -19285 0

c  -2-1 --> break 
c    ( b^{97, 9}_2 ∧  b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧ -p_873) -> break
c  in CNF:
c    -b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨  b^{97, 9}_0 ∨  p_873 ∨ break
c  in DIMACS:
-19280 -19281  19282  873 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 9}_2 ∧ -b^{97, 9}_1 ∧ -b^{97, 9}_0 ∧ true) 
c  in CNF:
c    -b^{97, 9}_2 ∨  b^{97, 9}_1 ∨  b^{97, 9}_0 ∨ false 
c  in DIMACS:
-19280  19281  19282  0

c  3 does not represent an automaton state.
c    -(-b^{97, 9}_2 ∧  b^{97, 9}_1 ∧  b^{97, 9}_0 ∧ true) 
c  in CNF:
c     b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ false 
c  in DIMACS:
 19280 -19281 -19282  0
c  -3 does not represent an automaton state.
c    -( b^{97, 9}_2 ∧  b^{97, 9}_1 ∧  b^{97, 9}_0 ∧ true) 
c  in CNF:
c    -b^{97, 9}_2 ∨ -b^{97, 9}_1 ∨ -b^{97, 9}_0 ∨ false 
c  in DIMACS:
-19280 -19281 -19282  0

c i = 10
c  -2+1 --> -1
c    ( b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧  p_970) -> ( b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0)
c  in CNF:
c    -b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨  b^{97, 11}_2
c    -b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_1
c    -b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨  b^{97, 11}_0
c  in DIMACS:
-19283 -19284  19285 -970  19286 0
-19283 -19284  19285 -970 -19287 0
-19283 -19284  19285 -970  19288 0

c  -1+1 --> 0
c    ( b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0 ∧  p_970) -> (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧ -b^{97, 11}_0)
c  in CNF:
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_2
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_1
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_0
c  in DIMACS:
-19283  19284 -19285 -970 -19286 0
-19283  19284 -19285 -970 -19287 0
-19283  19284 -19285 -970 -19288 0

c  0+1 --> 1
c    (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧  p_970) -> (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0)
c  in CNF:
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_2
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_1
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨  b^{97, 11}_0
c  in DIMACS:
 19283  19284  19285 -970 -19286 0
 19283  19284  19285 -970 -19287 0
 19283  19284  19285 -970  19288 0

c  1+1 --> 2
c    (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0 ∧  p_970) -> (-b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0)
c  in CNF:
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_2
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨  b^{97, 11}_1
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ -p_970 ∨ -b^{97, 11}_0
c  in DIMACS:
 19283  19284 -19285 -970 -19286 0
 19283  19284 -19285 -970  19287 0
 19283  19284 -19285 -970 -19288 0

c  2+1 --> break 
c    (-b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧  p_970) -> break
c  in CNF:
c     b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 19283 -19284  19285 -970 1162 0


c  2-1 --> 1
c    (-b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧ -p_970) -> (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0)
c  in CNF:
c     b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_2
c     b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_1
c     b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨  b^{97, 11}_0
c  in DIMACS:
 19283 -19284  19285  970 -19286 0
 19283 -19284  19285  970 -19287 0
 19283 -19284  19285  970  19288 0

c  1-1 --> 0
c    (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0 ∧ -p_970) -> (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧ -b^{97, 11}_0)
c  in CNF:
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_2
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_1
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_0
c  in DIMACS:
 19283  19284 -19285  970 -19286 0
 19283  19284 -19285  970 -19287 0
 19283  19284 -19285  970 -19288 0

c  0-1 --> -1
c    (-b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧ -p_970) -> ( b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0)
c  in CNF:
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨  b^{97, 11}_2
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_1
c     b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨  b^{97, 11}_0
c  in DIMACS:
 19283  19284  19285  970  19286 0
 19283  19284  19285  970 -19287 0
 19283  19284  19285  970  19288 0

c  -1-1 --> -2
c    ( b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧  b^{97, 10}_0 ∧ -p_970) -> ( b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0)
c  in CNF:
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨  b^{97, 11}_2
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨  b^{97, 11}_1
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨  p_970 ∨ -b^{97, 11}_0
c  in DIMACS:
-19283  19284 -19285  970  19286 0
-19283  19284 -19285  970  19287 0
-19283  19284 -19285  970 -19288 0

c  -2-1 --> break 
c    ( b^{97, 10}_2 ∧  b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨  b^{97, 10}_0 ∨  p_970 ∨ break
c  in DIMACS:
-19283 -19284  19285  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 10}_2 ∧ -b^{97, 10}_1 ∧ -b^{97, 10}_0 ∧ true) 
c  in CNF:
c    -b^{97, 10}_2 ∨  b^{97, 10}_1 ∨  b^{97, 10}_0 ∨ false 
c  in DIMACS:
-19283  19284  19285  0

c  3 does not represent an automaton state.
c    -(-b^{97, 10}_2 ∧  b^{97, 10}_1 ∧  b^{97, 10}_0 ∧ true) 
c  in CNF:
c     b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ false 
c  in DIMACS:
 19283 -19284 -19285  0
c  -3 does not represent an automaton state.
c    -( b^{97, 10}_2 ∧  b^{97, 10}_1 ∧  b^{97, 10}_0 ∧ true) 
c  in CNF:
c    -b^{97, 10}_2 ∨ -b^{97, 10}_1 ∨ -b^{97, 10}_0 ∨ false 
c  in DIMACS:
-19283 -19284 -19285  0

c i = 11
c  -2+1 --> -1
c    ( b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧  p_1067) -> ( b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧  b^{97, 12}_0)
c  in CNF:
c    -b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨  b^{97, 12}_2
c    -b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_1
c    -b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨  b^{97, 12}_0
c  in DIMACS:
-19286 -19287  19288 -1067  19289 0
-19286 -19287  19288 -1067 -19290 0
-19286 -19287  19288 -1067  19291 0

c  -1+1 --> 0
c    ( b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0 ∧  p_1067) -> (-b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧ -b^{97, 12}_0)
c  in CNF:
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_2
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_1
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_0
c  in DIMACS:
-19286  19287 -19288 -1067 -19289 0
-19286  19287 -19288 -1067 -19290 0
-19286  19287 -19288 -1067 -19291 0

c  0+1 --> 1
c    (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧  p_1067) -> (-b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧  b^{97, 12}_0)
c  in CNF:
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_2
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_1
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨  b^{97, 12}_0
c  in DIMACS:
 19286  19287  19288 -1067 -19289 0
 19286  19287  19288 -1067 -19290 0
 19286  19287  19288 -1067  19291 0

c  1+1 --> 2
c    (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0 ∧  p_1067) -> (-b^{97, 12}_2 ∧  b^{97, 12}_1 ∧ -b^{97, 12}_0)
c  in CNF:
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_2
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨  b^{97, 12}_1
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ -p_1067 ∨ -b^{97, 12}_0
c  in DIMACS:
 19286  19287 -19288 -1067 -19289 0
 19286  19287 -19288 -1067  19290 0
 19286  19287 -19288 -1067 -19291 0

c  2+1 --> break 
c    (-b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧  p_1067) -> break
c  in CNF:
c     b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ -p_1067 ∨ break
c  in DIMACS:
 19286 -19287  19288 -1067 1162 0


c  2-1 --> 1
c    (-b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧ -p_1067) -> (-b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧  b^{97, 12}_0)
c  in CNF:
c     b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_2
c     b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_1
c     b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨  b^{97, 12}_0
c  in DIMACS:
 19286 -19287  19288  1067 -19289 0
 19286 -19287  19288  1067 -19290 0
 19286 -19287  19288  1067  19291 0

c  1-1 --> 0
c    (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0 ∧ -p_1067) -> (-b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧ -b^{97, 12}_0)
c  in CNF:
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_2
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_1
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_0
c  in DIMACS:
 19286  19287 -19288  1067 -19289 0
 19286  19287 -19288  1067 -19290 0
 19286  19287 -19288  1067 -19291 0

c  0-1 --> -1
c    (-b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧ -p_1067) -> ( b^{97, 12}_2 ∧ -b^{97, 12}_1 ∧  b^{97, 12}_0)
c  in CNF:
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨  b^{97, 12}_2
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_1
c     b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨  b^{97, 12}_0
c  in DIMACS:
 19286  19287  19288  1067  19289 0
 19286  19287  19288  1067 -19290 0
 19286  19287  19288  1067  19291 0

c  -1-1 --> -2
c    ( b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧  b^{97, 11}_0 ∧ -p_1067) -> ( b^{97, 12}_2 ∧  b^{97, 12}_1 ∧ -b^{97, 12}_0)
c  in CNF:
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨  b^{97, 12}_2
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨  b^{97, 12}_1
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨  p_1067 ∨ -b^{97, 12}_0
c  in DIMACS:
-19286  19287 -19288  1067  19289 0
-19286  19287 -19288  1067  19290 0
-19286  19287 -19288  1067 -19291 0

c  -2-1 --> break 
c    ( b^{97, 11}_2 ∧  b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧ -p_1067) -> break
c  in CNF:
c    -b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨  b^{97, 11}_0 ∨  p_1067 ∨ break
c  in DIMACS:
-19286 -19287  19288  1067 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{97, 11}_2 ∧ -b^{97, 11}_1 ∧ -b^{97, 11}_0 ∧ true) 
c  in CNF:
c    -b^{97, 11}_2 ∨  b^{97, 11}_1 ∨  b^{97, 11}_0 ∨ false 
c  in DIMACS:
-19286  19287  19288  0

c  3 does not represent an automaton state.
c    -(-b^{97, 11}_2 ∧  b^{97, 11}_1 ∧  b^{97, 11}_0 ∧ true) 
c  in CNF:
c     b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ false 
c  in DIMACS:
 19286 -19287 -19288  0
c  -3 does not represent an automaton state.
c    -( b^{97, 11}_2 ∧  b^{97, 11}_1 ∧  b^{97, 11}_0 ∧ true) 
c  in CNF:
c    -b^{97, 11}_2 ∨ -b^{97, 11}_1 ∨ -b^{97, 11}_0 ∨ false 
c  in DIMACS:
-19286 -19287 -19288  0

c INIT for k = 98
c    -b^{98, 1}_2
c    -b^{98, 1}_1
c    -b^{98, 1}_0
c  in DIMACS:
-19292 0
-19293 0
-19294 0

c Transitions for k = 98
c i = 1
c  -2+1 --> -1
c    ( b^{98, 1}_2 ∧  b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧  p_98) -> ( b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0)
c  in CNF:
c    -b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨  b^{98, 2}_2
c    -b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_1
c    -b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨  b^{98, 2}_0
c  in DIMACS:
-19292 -19293  19294 -98  19295 0
-19292 -19293  19294 -98 -19296 0
-19292 -19293  19294 -98  19297 0

c  -1+1 --> 0
c    ( b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧  b^{98, 1}_0 ∧  p_98) -> (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧ -b^{98, 2}_0)
c  in CNF:
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_2
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_1
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_0
c  in DIMACS:
-19292  19293 -19294 -98 -19295 0
-19292  19293 -19294 -98 -19296 0
-19292  19293 -19294 -98 -19297 0

c  0+1 --> 1
c    (-b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧  p_98) -> (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0)
c  in CNF:
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_2
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_1
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨  b^{98, 2}_0
c  in DIMACS:
 19292  19293  19294 -98 -19295 0
 19292  19293  19294 -98 -19296 0
 19292  19293  19294 -98  19297 0

c  1+1 --> 2
c    (-b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧  b^{98, 1}_0 ∧  p_98) -> (-b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0)
c  in CNF:
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_2
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨  b^{98, 2}_1
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ -p_98 ∨ -b^{98, 2}_0
c  in DIMACS:
 19292  19293 -19294 -98 -19295 0
 19292  19293 -19294 -98  19296 0
 19292  19293 -19294 -98 -19297 0

c  2+1 --> break 
c    (-b^{98, 1}_2 ∧  b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧  p_98) -> break
c  in CNF:
c     b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ -p_98 ∨ break
c  in DIMACS:
 19292 -19293  19294 -98 1162 0


c  2-1 --> 1
c    (-b^{98, 1}_2 ∧  b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧ -p_98) -> (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0)
c  in CNF:
c     b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_2
c     b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_1
c     b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨  b^{98, 2}_0
c  in DIMACS:
 19292 -19293  19294  98 -19295 0
 19292 -19293  19294  98 -19296 0
 19292 -19293  19294  98  19297 0

c  1-1 --> 0
c    (-b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧  b^{98, 1}_0 ∧ -p_98) -> (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧ -b^{98, 2}_0)
c  in CNF:
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_2
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_1
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_0
c  in DIMACS:
 19292  19293 -19294  98 -19295 0
 19292  19293 -19294  98 -19296 0
 19292  19293 -19294  98 -19297 0

c  0-1 --> -1
c    (-b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧ -p_98) -> ( b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0)
c  in CNF:
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨  b^{98, 2}_2
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_1
c     b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨  b^{98, 2}_0
c  in DIMACS:
 19292  19293  19294  98  19295 0
 19292  19293  19294  98 -19296 0
 19292  19293  19294  98  19297 0

c  -1-1 --> -2
c    ( b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧  b^{98, 1}_0 ∧ -p_98) -> ( b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0)
c  in CNF:
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨  b^{98, 2}_2
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨  b^{98, 2}_1
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨  p_98 ∨ -b^{98, 2}_0
c  in DIMACS:
-19292  19293 -19294  98  19295 0
-19292  19293 -19294  98  19296 0
-19292  19293 -19294  98 -19297 0

c  -2-1 --> break 
c    ( b^{98, 1}_2 ∧  b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧ -p_98) -> break
c  in CNF:
c    -b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨  b^{98, 1}_0 ∨  p_98 ∨ break
c  in DIMACS:
-19292 -19293  19294  98 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 1}_2 ∧ -b^{98, 1}_1 ∧ -b^{98, 1}_0 ∧ true) 
c  in CNF:
c    -b^{98, 1}_2 ∨  b^{98, 1}_1 ∨  b^{98, 1}_0 ∨ false 
c  in DIMACS:
-19292  19293  19294  0

c  3 does not represent an automaton state.
c    -(-b^{98, 1}_2 ∧  b^{98, 1}_1 ∧  b^{98, 1}_0 ∧ true) 
c  in CNF:
c     b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ false 
c  in DIMACS:
 19292 -19293 -19294  0
c  -3 does not represent an automaton state.
c    -( b^{98, 1}_2 ∧  b^{98, 1}_1 ∧  b^{98, 1}_0 ∧ true) 
c  in CNF:
c    -b^{98, 1}_2 ∨ -b^{98, 1}_1 ∨ -b^{98, 1}_0 ∨ false 
c  in DIMACS:
-19292 -19293 -19294  0

c i = 2
c  -2+1 --> -1
c    ( b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧  p_196) -> ( b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0)
c  in CNF:
c    -b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨  b^{98, 3}_2
c    -b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_1
c    -b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨  b^{98, 3}_0
c  in DIMACS:
-19295 -19296  19297 -196  19298 0
-19295 -19296  19297 -196 -19299 0
-19295 -19296  19297 -196  19300 0

c  -1+1 --> 0
c    ( b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0 ∧  p_196) -> (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧ -b^{98, 3}_0)
c  in CNF:
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_2
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_1
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_0
c  in DIMACS:
-19295  19296 -19297 -196 -19298 0
-19295  19296 -19297 -196 -19299 0
-19295  19296 -19297 -196 -19300 0

c  0+1 --> 1
c    (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧  p_196) -> (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0)
c  in CNF:
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_2
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_1
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨  b^{98, 3}_0
c  in DIMACS:
 19295  19296  19297 -196 -19298 0
 19295  19296  19297 -196 -19299 0
 19295  19296  19297 -196  19300 0

c  1+1 --> 2
c    (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0 ∧  p_196) -> (-b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0)
c  in CNF:
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_2
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨  b^{98, 3}_1
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ -p_196 ∨ -b^{98, 3}_0
c  in DIMACS:
 19295  19296 -19297 -196 -19298 0
 19295  19296 -19297 -196  19299 0
 19295  19296 -19297 -196 -19300 0

c  2+1 --> break 
c    (-b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧  p_196) -> break
c  in CNF:
c     b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 19295 -19296  19297 -196 1162 0


c  2-1 --> 1
c    (-b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧ -p_196) -> (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0)
c  in CNF:
c     b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_2
c     b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_1
c     b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨  b^{98, 3}_0
c  in DIMACS:
 19295 -19296  19297  196 -19298 0
 19295 -19296  19297  196 -19299 0
 19295 -19296  19297  196  19300 0

c  1-1 --> 0
c    (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0 ∧ -p_196) -> (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧ -b^{98, 3}_0)
c  in CNF:
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_2
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_1
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_0
c  in DIMACS:
 19295  19296 -19297  196 -19298 0
 19295  19296 -19297  196 -19299 0
 19295  19296 -19297  196 -19300 0

c  0-1 --> -1
c    (-b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧ -p_196) -> ( b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0)
c  in CNF:
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨  b^{98, 3}_2
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_1
c     b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨  b^{98, 3}_0
c  in DIMACS:
 19295  19296  19297  196  19298 0
 19295  19296  19297  196 -19299 0
 19295  19296  19297  196  19300 0

c  -1-1 --> -2
c    ( b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧  b^{98, 2}_0 ∧ -p_196) -> ( b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0)
c  in CNF:
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨  b^{98, 3}_2
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨  b^{98, 3}_1
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨  p_196 ∨ -b^{98, 3}_0
c  in DIMACS:
-19295  19296 -19297  196  19298 0
-19295  19296 -19297  196  19299 0
-19295  19296 -19297  196 -19300 0

c  -2-1 --> break 
c    ( b^{98, 2}_2 ∧  b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨  b^{98, 2}_0 ∨  p_196 ∨ break
c  in DIMACS:
-19295 -19296  19297  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 2}_2 ∧ -b^{98, 2}_1 ∧ -b^{98, 2}_0 ∧ true) 
c  in CNF:
c    -b^{98, 2}_2 ∨  b^{98, 2}_1 ∨  b^{98, 2}_0 ∨ false 
c  in DIMACS:
-19295  19296  19297  0

c  3 does not represent an automaton state.
c    -(-b^{98, 2}_2 ∧  b^{98, 2}_1 ∧  b^{98, 2}_0 ∧ true) 
c  in CNF:
c     b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ false 
c  in DIMACS:
 19295 -19296 -19297  0
c  -3 does not represent an automaton state.
c    -( b^{98, 2}_2 ∧  b^{98, 2}_1 ∧  b^{98, 2}_0 ∧ true) 
c  in CNF:
c    -b^{98, 2}_2 ∨ -b^{98, 2}_1 ∨ -b^{98, 2}_0 ∨ false 
c  in DIMACS:
-19295 -19296 -19297  0

c i = 3
c  -2+1 --> -1
c    ( b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧  p_294) -> ( b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0)
c  in CNF:
c    -b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨  b^{98, 4}_2
c    -b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_1
c    -b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨  b^{98, 4}_0
c  in DIMACS:
-19298 -19299  19300 -294  19301 0
-19298 -19299  19300 -294 -19302 0
-19298 -19299  19300 -294  19303 0

c  -1+1 --> 0
c    ( b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0 ∧  p_294) -> (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧ -b^{98, 4}_0)
c  in CNF:
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_2
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_1
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_0
c  in DIMACS:
-19298  19299 -19300 -294 -19301 0
-19298  19299 -19300 -294 -19302 0
-19298  19299 -19300 -294 -19303 0

c  0+1 --> 1
c    (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧  p_294) -> (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0)
c  in CNF:
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_2
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_1
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨  b^{98, 4}_0
c  in DIMACS:
 19298  19299  19300 -294 -19301 0
 19298  19299  19300 -294 -19302 0
 19298  19299  19300 -294  19303 0

c  1+1 --> 2
c    (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0 ∧  p_294) -> (-b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0)
c  in CNF:
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_2
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨  b^{98, 4}_1
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ -p_294 ∨ -b^{98, 4}_0
c  in DIMACS:
 19298  19299 -19300 -294 -19301 0
 19298  19299 -19300 -294  19302 0
 19298  19299 -19300 -294 -19303 0

c  2+1 --> break 
c    (-b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧  p_294) -> break
c  in CNF:
c     b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 19298 -19299  19300 -294 1162 0


c  2-1 --> 1
c    (-b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧ -p_294) -> (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0)
c  in CNF:
c     b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_2
c     b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_1
c     b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨  b^{98, 4}_0
c  in DIMACS:
 19298 -19299  19300  294 -19301 0
 19298 -19299  19300  294 -19302 0
 19298 -19299  19300  294  19303 0

c  1-1 --> 0
c    (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0 ∧ -p_294) -> (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧ -b^{98, 4}_0)
c  in CNF:
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_2
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_1
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_0
c  in DIMACS:
 19298  19299 -19300  294 -19301 0
 19298  19299 -19300  294 -19302 0
 19298  19299 -19300  294 -19303 0

c  0-1 --> -1
c    (-b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧ -p_294) -> ( b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0)
c  in CNF:
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨  b^{98, 4}_2
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_1
c     b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨  b^{98, 4}_0
c  in DIMACS:
 19298  19299  19300  294  19301 0
 19298  19299  19300  294 -19302 0
 19298  19299  19300  294  19303 0

c  -1-1 --> -2
c    ( b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧  b^{98, 3}_0 ∧ -p_294) -> ( b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0)
c  in CNF:
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨  b^{98, 4}_2
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨  b^{98, 4}_1
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨  p_294 ∨ -b^{98, 4}_0
c  in DIMACS:
-19298  19299 -19300  294  19301 0
-19298  19299 -19300  294  19302 0
-19298  19299 -19300  294 -19303 0

c  -2-1 --> break 
c    ( b^{98, 3}_2 ∧  b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨  b^{98, 3}_0 ∨  p_294 ∨ break
c  in DIMACS:
-19298 -19299  19300  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 3}_2 ∧ -b^{98, 3}_1 ∧ -b^{98, 3}_0 ∧ true) 
c  in CNF:
c    -b^{98, 3}_2 ∨  b^{98, 3}_1 ∨  b^{98, 3}_0 ∨ false 
c  in DIMACS:
-19298  19299  19300  0

c  3 does not represent an automaton state.
c    -(-b^{98, 3}_2 ∧  b^{98, 3}_1 ∧  b^{98, 3}_0 ∧ true) 
c  in CNF:
c     b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ false 
c  in DIMACS:
 19298 -19299 -19300  0
c  -3 does not represent an automaton state.
c    -( b^{98, 3}_2 ∧  b^{98, 3}_1 ∧  b^{98, 3}_0 ∧ true) 
c  in CNF:
c    -b^{98, 3}_2 ∨ -b^{98, 3}_1 ∨ -b^{98, 3}_0 ∨ false 
c  in DIMACS:
-19298 -19299 -19300  0

c i = 4
c  -2+1 --> -1
c    ( b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧  p_392) -> ( b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0)
c  in CNF:
c    -b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨  b^{98, 5}_2
c    -b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_1
c    -b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨  b^{98, 5}_0
c  in DIMACS:
-19301 -19302  19303 -392  19304 0
-19301 -19302  19303 -392 -19305 0
-19301 -19302  19303 -392  19306 0

c  -1+1 --> 0
c    ( b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0 ∧  p_392) -> (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧ -b^{98, 5}_0)
c  in CNF:
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_2
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_1
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_0
c  in DIMACS:
-19301  19302 -19303 -392 -19304 0
-19301  19302 -19303 -392 -19305 0
-19301  19302 -19303 -392 -19306 0

c  0+1 --> 1
c    (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧  p_392) -> (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0)
c  in CNF:
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_2
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_1
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨  b^{98, 5}_0
c  in DIMACS:
 19301  19302  19303 -392 -19304 0
 19301  19302  19303 -392 -19305 0
 19301  19302  19303 -392  19306 0

c  1+1 --> 2
c    (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0 ∧  p_392) -> (-b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0)
c  in CNF:
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_2
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨  b^{98, 5}_1
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ -p_392 ∨ -b^{98, 5}_0
c  in DIMACS:
 19301  19302 -19303 -392 -19304 0
 19301  19302 -19303 -392  19305 0
 19301  19302 -19303 -392 -19306 0

c  2+1 --> break 
c    (-b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧  p_392) -> break
c  in CNF:
c     b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 19301 -19302  19303 -392 1162 0


c  2-1 --> 1
c    (-b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧ -p_392) -> (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0)
c  in CNF:
c     b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_2
c     b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_1
c     b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨  b^{98, 5}_0
c  in DIMACS:
 19301 -19302  19303  392 -19304 0
 19301 -19302  19303  392 -19305 0
 19301 -19302  19303  392  19306 0

c  1-1 --> 0
c    (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0 ∧ -p_392) -> (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧ -b^{98, 5}_0)
c  in CNF:
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_2
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_1
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_0
c  in DIMACS:
 19301  19302 -19303  392 -19304 0
 19301  19302 -19303  392 -19305 0
 19301  19302 -19303  392 -19306 0

c  0-1 --> -1
c    (-b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧ -p_392) -> ( b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0)
c  in CNF:
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨  b^{98, 5}_2
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_1
c     b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨  b^{98, 5}_0
c  in DIMACS:
 19301  19302  19303  392  19304 0
 19301  19302  19303  392 -19305 0
 19301  19302  19303  392  19306 0

c  -1-1 --> -2
c    ( b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧  b^{98, 4}_0 ∧ -p_392) -> ( b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0)
c  in CNF:
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨  b^{98, 5}_2
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨  b^{98, 5}_1
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨  p_392 ∨ -b^{98, 5}_0
c  in DIMACS:
-19301  19302 -19303  392  19304 0
-19301  19302 -19303  392  19305 0
-19301  19302 -19303  392 -19306 0

c  -2-1 --> break 
c    ( b^{98, 4}_2 ∧  b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨  b^{98, 4}_0 ∨  p_392 ∨ break
c  in DIMACS:
-19301 -19302  19303  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 4}_2 ∧ -b^{98, 4}_1 ∧ -b^{98, 4}_0 ∧ true) 
c  in CNF:
c    -b^{98, 4}_2 ∨  b^{98, 4}_1 ∨  b^{98, 4}_0 ∨ false 
c  in DIMACS:
-19301  19302  19303  0

c  3 does not represent an automaton state.
c    -(-b^{98, 4}_2 ∧  b^{98, 4}_1 ∧  b^{98, 4}_0 ∧ true) 
c  in CNF:
c     b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ false 
c  in DIMACS:
 19301 -19302 -19303  0
c  -3 does not represent an automaton state.
c    -( b^{98, 4}_2 ∧  b^{98, 4}_1 ∧  b^{98, 4}_0 ∧ true) 
c  in CNF:
c    -b^{98, 4}_2 ∨ -b^{98, 4}_1 ∨ -b^{98, 4}_0 ∨ false 
c  in DIMACS:
-19301 -19302 -19303  0

c i = 5
c  -2+1 --> -1
c    ( b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧  p_490) -> ( b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0)
c  in CNF:
c    -b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨  b^{98, 6}_2
c    -b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_1
c    -b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨  b^{98, 6}_0
c  in DIMACS:
-19304 -19305  19306 -490  19307 0
-19304 -19305  19306 -490 -19308 0
-19304 -19305  19306 -490  19309 0

c  -1+1 --> 0
c    ( b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0 ∧  p_490) -> (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧ -b^{98, 6}_0)
c  in CNF:
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_2
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_1
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_0
c  in DIMACS:
-19304  19305 -19306 -490 -19307 0
-19304  19305 -19306 -490 -19308 0
-19304  19305 -19306 -490 -19309 0

c  0+1 --> 1
c    (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧  p_490) -> (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0)
c  in CNF:
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_2
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_1
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨  b^{98, 6}_0
c  in DIMACS:
 19304  19305  19306 -490 -19307 0
 19304  19305  19306 -490 -19308 0
 19304  19305  19306 -490  19309 0

c  1+1 --> 2
c    (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0 ∧  p_490) -> (-b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0)
c  in CNF:
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_2
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨  b^{98, 6}_1
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ -p_490 ∨ -b^{98, 6}_0
c  in DIMACS:
 19304  19305 -19306 -490 -19307 0
 19304  19305 -19306 -490  19308 0
 19304  19305 -19306 -490 -19309 0

c  2+1 --> break 
c    (-b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧  p_490) -> break
c  in CNF:
c     b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 19304 -19305  19306 -490 1162 0


c  2-1 --> 1
c    (-b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧ -p_490) -> (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0)
c  in CNF:
c     b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_2
c     b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_1
c     b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨  b^{98, 6}_0
c  in DIMACS:
 19304 -19305  19306  490 -19307 0
 19304 -19305  19306  490 -19308 0
 19304 -19305  19306  490  19309 0

c  1-1 --> 0
c    (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0 ∧ -p_490) -> (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧ -b^{98, 6}_0)
c  in CNF:
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_2
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_1
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_0
c  in DIMACS:
 19304  19305 -19306  490 -19307 0
 19304  19305 -19306  490 -19308 0
 19304  19305 -19306  490 -19309 0

c  0-1 --> -1
c    (-b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧ -p_490) -> ( b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0)
c  in CNF:
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨  b^{98, 6}_2
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_1
c     b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨  b^{98, 6}_0
c  in DIMACS:
 19304  19305  19306  490  19307 0
 19304  19305  19306  490 -19308 0
 19304  19305  19306  490  19309 0

c  -1-1 --> -2
c    ( b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧  b^{98, 5}_0 ∧ -p_490) -> ( b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0)
c  in CNF:
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨  b^{98, 6}_2
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨  b^{98, 6}_1
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨  p_490 ∨ -b^{98, 6}_0
c  in DIMACS:
-19304  19305 -19306  490  19307 0
-19304  19305 -19306  490  19308 0
-19304  19305 -19306  490 -19309 0

c  -2-1 --> break 
c    ( b^{98, 5}_2 ∧  b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨  b^{98, 5}_0 ∨  p_490 ∨ break
c  in DIMACS:
-19304 -19305  19306  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 5}_2 ∧ -b^{98, 5}_1 ∧ -b^{98, 5}_0 ∧ true) 
c  in CNF:
c    -b^{98, 5}_2 ∨  b^{98, 5}_1 ∨  b^{98, 5}_0 ∨ false 
c  in DIMACS:
-19304  19305  19306  0

c  3 does not represent an automaton state.
c    -(-b^{98, 5}_2 ∧  b^{98, 5}_1 ∧  b^{98, 5}_0 ∧ true) 
c  in CNF:
c     b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ false 
c  in DIMACS:
 19304 -19305 -19306  0
c  -3 does not represent an automaton state.
c    -( b^{98, 5}_2 ∧  b^{98, 5}_1 ∧  b^{98, 5}_0 ∧ true) 
c  in CNF:
c    -b^{98, 5}_2 ∨ -b^{98, 5}_1 ∨ -b^{98, 5}_0 ∨ false 
c  in DIMACS:
-19304 -19305 -19306  0

c i = 6
c  -2+1 --> -1
c    ( b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧  p_588) -> ( b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0)
c  in CNF:
c    -b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨  b^{98, 7}_2
c    -b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_1
c    -b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨  b^{98, 7}_0
c  in DIMACS:
-19307 -19308  19309 -588  19310 0
-19307 -19308  19309 -588 -19311 0
-19307 -19308  19309 -588  19312 0

c  -1+1 --> 0
c    ( b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0 ∧  p_588) -> (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧ -b^{98, 7}_0)
c  in CNF:
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_2
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_1
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_0
c  in DIMACS:
-19307  19308 -19309 -588 -19310 0
-19307  19308 -19309 -588 -19311 0
-19307  19308 -19309 -588 -19312 0

c  0+1 --> 1
c    (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧  p_588) -> (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0)
c  in CNF:
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_2
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_1
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨  b^{98, 7}_0
c  in DIMACS:
 19307  19308  19309 -588 -19310 0
 19307  19308  19309 -588 -19311 0
 19307  19308  19309 -588  19312 0

c  1+1 --> 2
c    (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0 ∧  p_588) -> (-b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0)
c  in CNF:
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_2
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨  b^{98, 7}_1
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ -p_588 ∨ -b^{98, 7}_0
c  in DIMACS:
 19307  19308 -19309 -588 -19310 0
 19307  19308 -19309 -588  19311 0
 19307  19308 -19309 -588 -19312 0

c  2+1 --> break 
c    (-b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧  p_588) -> break
c  in CNF:
c     b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 19307 -19308  19309 -588 1162 0


c  2-1 --> 1
c    (-b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧ -p_588) -> (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0)
c  in CNF:
c     b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_2
c     b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_1
c     b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨  b^{98, 7}_0
c  in DIMACS:
 19307 -19308  19309  588 -19310 0
 19307 -19308  19309  588 -19311 0
 19307 -19308  19309  588  19312 0

c  1-1 --> 0
c    (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0 ∧ -p_588) -> (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧ -b^{98, 7}_0)
c  in CNF:
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_2
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_1
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_0
c  in DIMACS:
 19307  19308 -19309  588 -19310 0
 19307  19308 -19309  588 -19311 0
 19307  19308 -19309  588 -19312 0

c  0-1 --> -1
c    (-b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧ -p_588) -> ( b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0)
c  in CNF:
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨  b^{98, 7}_2
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_1
c     b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨  b^{98, 7}_0
c  in DIMACS:
 19307  19308  19309  588  19310 0
 19307  19308  19309  588 -19311 0
 19307  19308  19309  588  19312 0

c  -1-1 --> -2
c    ( b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧  b^{98, 6}_0 ∧ -p_588) -> ( b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0)
c  in CNF:
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨  b^{98, 7}_2
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨  b^{98, 7}_1
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨  p_588 ∨ -b^{98, 7}_0
c  in DIMACS:
-19307  19308 -19309  588  19310 0
-19307  19308 -19309  588  19311 0
-19307  19308 -19309  588 -19312 0

c  -2-1 --> break 
c    ( b^{98, 6}_2 ∧  b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨  b^{98, 6}_0 ∨  p_588 ∨ break
c  in DIMACS:
-19307 -19308  19309  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 6}_2 ∧ -b^{98, 6}_1 ∧ -b^{98, 6}_0 ∧ true) 
c  in CNF:
c    -b^{98, 6}_2 ∨  b^{98, 6}_1 ∨  b^{98, 6}_0 ∨ false 
c  in DIMACS:
-19307  19308  19309  0

c  3 does not represent an automaton state.
c    -(-b^{98, 6}_2 ∧  b^{98, 6}_1 ∧  b^{98, 6}_0 ∧ true) 
c  in CNF:
c     b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ false 
c  in DIMACS:
 19307 -19308 -19309  0
c  -3 does not represent an automaton state.
c    -( b^{98, 6}_2 ∧  b^{98, 6}_1 ∧  b^{98, 6}_0 ∧ true) 
c  in CNF:
c    -b^{98, 6}_2 ∨ -b^{98, 6}_1 ∨ -b^{98, 6}_0 ∨ false 
c  in DIMACS:
-19307 -19308 -19309  0

c i = 7
c  -2+1 --> -1
c    ( b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧  p_686) -> ( b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0)
c  in CNF:
c    -b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨  b^{98, 8}_2
c    -b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_1
c    -b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨  b^{98, 8}_0
c  in DIMACS:
-19310 -19311  19312 -686  19313 0
-19310 -19311  19312 -686 -19314 0
-19310 -19311  19312 -686  19315 0

c  -1+1 --> 0
c    ( b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0 ∧  p_686) -> (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧ -b^{98, 8}_0)
c  in CNF:
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_2
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_1
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_0
c  in DIMACS:
-19310  19311 -19312 -686 -19313 0
-19310  19311 -19312 -686 -19314 0
-19310  19311 -19312 -686 -19315 0

c  0+1 --> 1
c    (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧  p_686) -> (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0)
c  in CNF:
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_2
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_1
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨  b^{98, 8}_0
c  in DIMACS:
 19310  19311  19312 -686 -19313 0
 19310  19311  19312 -686 -19314 0
 19310  19311  19312 -686  19315 0

c  1+1 --> 2
c    (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0 ∧  p_686) -> (-b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0)
c  in CNF:
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_2
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨  b^{98, 8}_1
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ -p_686 ∨ -b^{98, 8}_0
c  in DIMACS:
 19310  19311 -19312 -686 -19313 0
 19310  19311 -19312 -686  19314 0
 19310  19311 -19312 -686 -19315 0

c  2+1 --> break 
c    (-b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧  p_686) -> break
c  in CNF:
c     b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 19310 -19311  19312 -686 1162 0


c  2-1 --> 1
c    (-b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧ -p_686) -> (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0)
c  in CNF:
c     b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_2
c     b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_1
c     b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨  b^{98, 8}_0
c  in DIMACS:
 19310 -19311  19312  686 -19313 0
 19310 -19311  19312  686 -19314 0
 19310 -19311  19312  686  19315 0

c  1-1 --> 0
c    (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0 ∧ -p_686) -> (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧ -b^{98, 8}_0)
c  in CNF:
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_2
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_1
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_0
c  in DIMACS:
 19310  19311 -19312  686 -19313 0
 19310  19311 -19312  686 -19314 0
 19310  19311 -19312  686 -19315 0

c  0-1 --> -1
c    (-b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧ -p_686) -> ( b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0)
c  in CNF:
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨  b^{98, 8}_2
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_1
c     b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨  b^{98, 8}_0
c  in DIMACS:
 19310  19311  19312  686  19313 0
 19310  19311  19312  686 -19314 0
 19310  19311  19312  686  19315 0

c  -1-1 --> -2
c    ( b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧  b^{98, 7}_0 ∧ -p_686) -> ( b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0)
c  in CNF:
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨  b^{98, 8}_2
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨  b^{98, 8}_1
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨  p_686 ∨ -b^{98, 8}_0
c  in DIMACS:
-19310  19311 -19312  686  19313 0
-19310  19311 -19312  686  19314 0
-19310  19311 -19312  686 -19315 0

c  -2-1 --> break 
c    ( b^{98, 7}_2 ∧  b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨  b^{98, 7}_0 ∨  p_686 ∨ break
c  in DIMACS:
-19310 -19311  19312  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 7}_2 ∧ -b^{98, 7}_1 ∧ -b^{98, 7}_0 ∧ true) 
c  in CNF:
c    -b^{98, 7}_2 ∨  b^{98, 7}_1 ∨  b^{98, 7}_0 ∨ false 
c  in DIMACS:
-19310  19311  19312  0

c  3 does not represent an automaton state.
c    -(-b^{98, 7}_2 ∧  b^{98, 7}_1 ∧  b^{98, 7}_0 ∧ true) 
c  in CNF:
c     b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ false 
c  in DIMACS:
 19310 -19311 -19312  0
c  -3 does not represent an automaton state.
c    -( b^{98, 7}_2 ∧  b^{98, 7}_1 ∧  b^{98, 7}_0 ∧ true) 
c  in CNF:
c    -b^{98, 7}_2 ∨ -b^{98, 7}_1 ∨ -b^{98, 7}_0 ∨ false 
c  in DIMACS:
-19310 -19311 -19312  0

c i = 8
c  -2+1 --> -1
c    ( b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧  p_784) -> ( b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0)
c  in CNF:
c    -b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨  b^{98, 9}_2
c    -b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_1
c    -b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨  b^{98, 9}_0
c  in DIMACS:
-19313 -19314  19315 -784  19316 0
-19313 -19314  19315 -784 -19317 0
-19313 -19314  19315 -784  19318 0

c  -1+1 --> 0
c    ( b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0 ∧  p_784) -> (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧ -b^{98, 9}_0)
c  in CNF:
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_2
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_1
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_0
c  in DIMACS:
-19313  19314 -19315 -784 -19316 0
-19313  19314 -19315 -784 -19317 0
-19313  19314 -19315 -784 -19318 0

c  0+1 --> 1
c    (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧  p_784) -> (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0)
c  in CNF:
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_2
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_1
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨  b^{98, 9}_0
c  in DIMACS:
 19313  19314  19315 -784 -19316 0
 19313  19314  19315 -784 -19317 0
 19313  19314  19315 -784  19318 0

c  1+1 --> 2
c    (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0 ∧  p_784) -> (-b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0)
c  in CNF:
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_2
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨  b^{98, 9}_1
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ -p_784 ∨ -b^{98, 9}_0
c  in DIMACS:
 19313  19314 -19315 -784 -19316 0
 19313  19314 -19315 -784  19317 0
 19313  19314 -19315 -784 -19318 0

c  2+1 --> break 
c    (-b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧  p_784) -> break
c  in CNF:
c     b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 19313 -19314  19315 -784 1162 0


c  2-1 --> 1
c    (-b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧ -p_784) -> (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0)
c  in CNF:
c     b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_2
c     b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_1
c     b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨  b^{98, 9}_0
c  in DIMACS:
 19313 -19314  19315  784 -19316 0
 19313 -19314  19315  784 -19317 0
 19313 -19314  19315  784  19318 0

c  1-1 --> 0
c    (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0 ∧ -p_784) -> (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧ -b^{98, 9}_0)
c  in CNF:
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_2
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_1
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_0
c  in DIMACS:
 19313  19314 -19315  784 -19316 0
 19313  19314 -19315  784 -19317 0
 19313  19314 -19315  784 -19318 0

c  0-1 --> -1
c    (-b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧ -p_784) -> ( b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0)
c  in CNF:
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨  b^{98, 9}_2
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_1
c     b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨  b^{98, 9}_0
c  in DIMACS:
 19313  19314  19315  784  19316 0
 19313  19314  19315  784 -19317 0
 19313  19314  19315  784  19318 0

c  -1-1 --> -2
c    ( b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧  b^{98, 8}_0 ∧ -p_784) -> ( b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0)
c  in CNF:
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨  b^{98, 9}_2
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨  b^{98, 9}_1
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨  p_784 ∨ -b^{98, 9}_0
c  in DIMACS:
-19313  19314 -19315  784  19316 0
-19313  19314 -19315  784  19317 0
-19313  19314 -19315  784 -19318 0

c  -2-1 --> break 
c    ( b^{98, 8}_2 ∧  b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨  b^{98, 8}_0 ∨  p_784 ∨ break
c  in DIMACS:
-19313 -19314  19315  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 8}_2 ∧ -b^{98, 8}_1 ∧ -b^{98, 8}_0 ∧ true) 
c  in CNF:
c    -b^{98, 8}_2 ∨  b^{98, 8}_1 ∨  b^{98, 8}_0 ∨ false 
c  in DIMACS:
-19313  19314  19315  0

c  3 does not represent an automaton state.
c    -(-b^{98, 8}_2 ∧  b^{98, 8}_1 ∧  b^{98, 8}_0 ∧ true) 
c  in CNF:
c     b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ false 
c  in DIMACS:
 19313 -19314 -19315  0
c  -3 does not represent an automaton state.
c    -( b^{98, 8}_2 ∧  b^{98, 8}_1 ∧  b^{98, 8}_0 ∧ true) 
c  in CNF:
c    -b^{98, 8}_2 ∨ -b^{98, 8}_1 ∨ -b^{98, 8}_0 ∨ false 
c  in DIMACS:
-19313 -19314 -19315  0

c i = 9
c  -2+1 --> -1
c    ( b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧  p_882) -> ( b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0)
c  in CNF:
c    -b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨  b^{98, 10}_2
c    -b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_1
c    -b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨  b^{98, 10}_0
c  in DIMACS:
-19316 -19317  19318 -882  19319 0
-19316 -19317  19318 -882 -19320 0
-19316 -19317  19318 -882  19321 0

c  -1+1 --> 0
c    ( b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0 ∧  p_882) -> (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧ -b^{98, 10}_0)
c  in CNF:
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_2
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_1
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_0
c  in DIMACS:
-19316  19317 -19318 -882 -19319 0
-19316  19317 -19318 -882 -19320 0
-19316  19317 -19318 -882 -19321 0

c  0+1 --> 1
c    (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧  p_882) -> (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0)
c  in CNF:
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_2
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_1
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨  b^{98, 10}_0
c  in DIMACS:
 19316  19317  19318 -882 -19319 0
 19316  19317  19318 -882 -19320 0
 19316  19317  19318 -882  19321 0

c  1+1 --> 2
c    (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0 ∧  p_882) -> (-b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0)
c  in CNF:
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_2
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨  b^{98, 10}_1
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ -p_882 ∨ -b^{98, 10}_0
c  in DIMACS:
 19316  19317 -19318 -882 -19319 0
 19316  19317 -19318 -882  19320 0
 19316  19317 -19318 -882 -19321 0

c  2+1 --> break 
c    (-b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧  p_882) -> break
c  in CNF:
c     b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 19316 -19317  19318 -882 1162 0


c  2-1 --> 1
c    (-b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧ -p_882) -> (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0)
c  in CNF:
c     b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_2
c     b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_1
c     b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨  b^{98, 10}_0
c  in DIMACS:
 19316 -19317  19318  882 -19319 0
 19316 -19317  19318  882 -19320 0
 19316 -19317  19318  882  19321 0

c  1-1 --> 0
c    (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0 ∧ -p_882) -> (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧ -b^{98, 10}_0)
c  in CNF:
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_2
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_1
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_0
c  in DIMACS:
 19316  19317 -19318  882 -19319 0
 19316  19317 -19318  882 -19320 0
 19316  19317 -19318  882 -19321 0

c  0-1 --> -1
c    (-b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧ -p_882) -> ( b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0)
c  in CNF:
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨  b^{98, 10}_2
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_1
c     b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨  b^{98, 10}_0
c  in DIMACS:
 19316  19317  19318  882  19319 0
 19316  19317  19318  882 -19320 0
 19316  19317  19318  882  19321 0

c  -1-1 --> -2
c    ( b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧  b^{98, 9}_0 ∧ -p_882) -> ( b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0)
c  in CNF:
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨  b^{98, 10}_2
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨  b^{98, 10}_1
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨  p_882 ∨ -b^{98, 10}_0
c  in DIMACS:
-19316  19317 -19318  882  19319 0
-19316  19317 -19318  882  19320 0
-19316  19317 -19318  882 -19321 0

c  -2-1 --> break 
c    ( b^{98, 9}_2 ∧  b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨  b^{98, 9}_0 ∨  p_882 ∨ break
c  in DIMACS:
-19316 -19317  19318  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 9}_2 ∧ -b^{98, 9}_1 ∧ -b^{98, 9}_0 ∧ true) 
c  in CNF:
c    -b^{98, 9}_2 ∨  b^{98, 9}_1 ∨  b^{98, 9}_0 ∨ false 
c  in DIMACS:
-19316  19317  19318  0

c  3 does not represent an automaton state.
c    -(-b^{98, 9}_2 ∧  b^{98, 9}_1 ∧  b^{98, 9}_0 ∧ true) 
c  in CNF:
c     b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ false 
c  in DIMACS:
 19316 -19317 -19318  0
c  -3 does not represent an automaton state.
c    -( b^{98, 9}_2 ∧  b^{98, 9}_1 ∧  b^{98, 9}_0 ∧ true) 
c  in CNF:
c    -b^{98, 9}_2 ∨ -b^{98, 9}_1 ∨ -b^{98, 9}_0 ∨ false 
c  in DIMACS:
-19316 -19317 -19318  0

c i = 10
c  -2+1 --> -1
c    ( b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧  p_980) -> ( b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0)
c  in CNF:
c    -b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨  b^{98, 11}_2
c    -b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_1
c    -b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨  b^{98, 11}_0
c  in DIMACS:
-19319 -19320  19321 -980  19322 0
-19319 -19320  19321 -980 -19323 0
-19319 -19320  19321 -980  19324 0

c  -1+1 --> 0
c    ( b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0 ∧  p_980) -> (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧ -b^{98, 11}_0)
c  in CNF:
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_2
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_1
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_0
c  in DIMACS:
-19319  19320 -19321 -980 -19322 0
-19319  19320 -19321 -980 -19323 0
-19319  19320 -19321 -980 -19324 0

c  0+1 --> 1
c    (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧  p_980) -> (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0)
c  in CNF:
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_2
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_1
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨  b^{98, 11}_0
c  in DIMACS:
 19319  19320  19321 -980 -19322 0
 19319  19320  19321 -980 -19323 0
 19319  19320  19321 -980  19324 0

c  1+1 --> 2
c    (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0 ∧  p_980) -> (-b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0)
c  in CNF:
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_2
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨  b^{98, 11}_1
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ -p_980 ∨ -b^{98, 11}_0
c  in DIMACS:
 19319  19320 -19321 -980 -19322 0
 19319  19320 -19321 -980  19323 0
 19319  19320 -19321 -980 -19324 0

c  2+1 --> break 
c    (-b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧  p_980) -> break
c  in CNF:
c     b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 19319 -19320  19321 -980 1162 0


c  2-1 --> 1
c    (-b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧ -p_980) -> (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0)
c  in CNF:
c     b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_2
c     b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_1
c     b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨  b^{98, 11}_0
c  in DIMACS:
 19319 -19320  19321  980 -19322 0
 19319 -19320  19321  980 -19323 0
 19319 -19320  19321  980  19324 0

c  1-1 --> 0
c    (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0 ∧ -p_980) -> (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧ -b^{98, 11}_0)
c  in CNF:
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_2
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_1
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_0
c  in DIMACS:
 19319  19320 -19321  980 -19322 0
 19319  19320 -19321  980 -19323 0
 19319  19320 -19321  980 -19324 0

c  0-1 --> -1
c    (-b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧ -p_980) -> ( b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0)
c  in CNF:
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨  b^{98, 11}_2
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_1
c     b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨  b^{98, 11}_0
c  in DIMACS:
 19319  19320  19321  980  19322 0
 19319  19320  19321  980 -19323 0
 19319  19320  19321  980  19324 0

c  -1-1 --> -2
c    ( b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧  b^{98, 10}_0 ∧ -p_980) -> ( b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0)
c  in CNF:
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨  b^{98, 11}_2
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨  b^{98, 11}_1
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨  p_980 ∨ -b^{98, 11}_0
c  in DIMACS:
-19319  19320 -19321  980  19322 0
-19319  19320 -19321  980  19323 0
-19319  19320 -19321  980 -19324 0

c  -2-1 --> break 
c    ( b^{98, 10}_2 ∧  b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨  b^{98, 10}_0 ∨  p_980 ∨ break
c  in DIMACS:
-19319 -19320  19321  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 10}_2 ∧ -b^{98, 10}_1 ∧ -b^{98, 10}_0 ∧ true) 
c  in CNF:
c    -b^{98, 10}_2 ∨  b^{98, 10}_1 ∨  b^{98, 10}_0 ∨ false 
c  in DIMACS:
-19319  19320  19321  0

c  3 does not represent an automaton state.
c    -(-b^{98, 10}_2 ∧  b^{98, 10}_1 ∧  b^{98, 10}_0 ∧ true) 
c  in CNF:
c     b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ false 
c  in DIMACS:
 19319 -19320 -19321  0
c  -3 does not represent an automaton state.
c    -( b^{98, 10}_2 ∧  b^{98, 10}_1 ∧  b^{98, 10}_0 ∧ true) 
c  in CNF:
c    -b^{98, 10}_2 ∨ -b^{98, 10}_1 ∨ -b^{98, 10}_0 ∨ false 
c  in DIMACS:
-19319 -19320 -19321  0

c i = 11
c  -2+1 --> -1
c    ( b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧  p_1078) -> ( b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧  b^{98, 12}_0)
c  in CNF:
c    -b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨  b^{98, 12}_2
c    -b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_1
c    -b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨  b^{98, 12}_0
c  in DIMACS:
-19322 -19323  19324 -1078  19325 0
-19322 -19323  19324 -1078 -19326 0
-19322 -19323  19324 -1078  19327 0

c  -1+1 --> 0
c    ( b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0 ∧  p_1078) -> (-b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧ -b^{98, 12}_0)
c  in CNF:
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_2
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_1
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_0
c  in DIMACS:
-19322  19323 -19324 -1078 -19325 0
-19322  19323 -19324 -1078 -19326 0
-19322  19323 -19324 -1078 -19327 0

c  0+1 --> 1
c    (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧  p_1078) -> (-b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧  b^{98, 12}_0)
c  in CNF:
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_2
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_1
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨  b^{98, 12}_0
c  in DIMACS:
 19322  19323  19324 -1078 -19325 0
 19322  19323  19324 -1078 -19326 0
 19322  19323  19324 -1078  19327 0

c  1+1 --> 2
c    (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0 ∧  p_1078) -> (-b^{98, 12}_2 ∧  b^{98, 12}_1 ∧ -b^{98, 12}_0)
c  in CNF:
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_2
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨  b^{98, 12}_1
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ -p_1078 ∨ -b^{98, 12}_0
c  in DIMACS:
 19322  19323 -19324 -1078 -19325 0
 19322  19323 -19324 -1078  19326 0
 19322  19323 -19324 -1078 -19327 0

c  2+1 --> break 
c    (-b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 19322 -19323  19324 -1078 1162 0


c  2-1 --> 1
c    (-b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧ -p_1078) -> (-b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧  b^{98, 12}_0)
c  in CNF:
c     b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_2
c     b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_1
c     b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨  b^{98, 12}_0
c  in DIMACS:
 19322 -19323  19324  1078 -19325 0
 19322 -19323  19324  1078 -19326 0
 19322 -19323  19324  1078  19327 0

c  1-1 --> 0
c    (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0 ∧ -p_1078) -> (-b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧ -b^{98, 12}_0)
c  in CNF:
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_2
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_1
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_0
c  in DIMACS:
 19322  19323 -19324  1078 -19325 0
 19322  19323 -19324  1078 -19326 0
 19322  19323 -19324  1078 -19327 0

c  0-1 --> -1
c    (-b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧ -p_1078) -> ( b^{98, 12}_2 ∧ -b^{98, 12}_1 ∧  b^{98, 12}_0)
c  in CNF:
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨  b^{98, 12}_2
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_1
c     b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨  b^{98, 12}_0
c  in DIMACS:
 19322  19323  19324  1078  19325 0
 19322  19323  19324  1078 -19326 0
 19322  19323  19324  1078  19327 0

c  -1-1 --> -2
c    ( b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧  b^{98, 11}_0 ∧ -p_1078) -> ( b^{98, 12}_2 ∧  b^{98, 12}_1 ∧ -b^{98, 12}_0)
c  in CNF:
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨  b^{98, 12}_2
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨  b^{98, 12}_1
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨  p_1078 ∨ -b^{98, 12}_0
c  in DIMACS:
-19322  19323 -19324  1078  19325 0
-19322  19323 -19324  1078  19326 0
-19322  19323 -19324  1078 -19327 0

c  -2-1 --> break 
c    ( b^{98, 11}_2 ∧  b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨  b^{98, 11}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-19322 -19323  19324  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{98, 11}_2 ∧ -b^{98, 11}_1 ∧ -b^{98, 11}_0 ∧ true) 
c  in CNF:
c    -b^{98, 11}_2 ∨  b^{98, 11}_1 ∨  b^{98, 11}_0 ∨ false 
c  in DIMACS:
-19322  19323  19324  0

c  3 does not represent an automaton state.
c    -(-b^{98, 11}_2 ∧  b^{98, 11}_1 ∧  b^{98, 11}_0 ∧ true) 
c  in CNF:
c     b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ false 
c  in DIMACS:
 19322 -19323 -19324  0
c  -3 does not represent an automaton state.
c    -( b^{98, 11}_2 ∧  b^{98, 11}_1 ∧  b^{98, 11}_0 ∧ true) 
c  in CNF:
c    -b^{98, 11}_2 ∨ -b^{98, 11}_1 ∨ -b^{98, 11}_0 ∨ false 
c  in DIMACS:
-19322 -19323 -19324  0

c INIT for k = 99
c    -b^{99, 1}_2
c    -b^{99, 1}_1
c    -b^{99, 1}_0
c  in DIMACS:
-19328 0
-19329 0
-19330 0

c Transitions for k = 99
c i = 1
c  -2+1 --> -1
c    ( b^{99, 1}_2 ∧  b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧  p_99) -> ( b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0)
c  in CNF:
c    -b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨  b^{99, 2}_2
c    -b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_1
c    -b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨  b^{99, 2}_0
c  in DIMACS:
-19328 -19329  19330 -99  19331 0
-19328 -19329  19330 -99 -19332 0
-19328 -19329  19330 -99  19333 0

c  -1+1 --> 0
c    ( b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧  b^{99, 1}_0 ∧  p_99) -> (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧ -b^{99, 2}_0)
c  in CNF:
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_2
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_1
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_0
c  in DIMACS:
-19328  19329 -19330 -99 -19331 0
-19328  19329 -19330 -99 -19332 0
-19328  19329 -19330 -99 -19333 0

c  0+1 --> 1
c    (-b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧  p_99) -> (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0)
c  in CNF:
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_2
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_1
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨  b^{99, 2}_0
c  in DIMACS:
 19328  19329  19330 -99 -19331 0
 19328  19329  19330 -99 -19332 0
 19328  19329  19330 -99  19333 0

c  1+1 --> 2
c    (-b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧  b^{99, 1}_0 ∧  p_99) -> (-b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0)
c  in CNF:
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_2
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨  b^{99, 2}_1
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ -p_99 ∨ -b^{99, 2}_0
c  in DIMACS:
 19328  19329 -19330 -99 -19331 0
 19328  19329 -19330 -99  19332 0
 19328  19329 -19330 -99 -19333 0

c  2+1 --> break 
c    (-b^{99, 1}_2 ∧  b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧  p_99) -> break
c  in CNF:
c     b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ -p_99 ∨ break
c  in DIMACS:
 19328 -19329  19330 -99 1162 0


c  2-1 --> 1
c    (-b^{99, 1}_2 ∧  b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧ -p_99) -> (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0)
c  in CNF:
c     b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_2
c     b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_1
c     b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨  b^{99, 2}_0
c  in DIMACS:
 19328 -19329  19330  99 -19331 0
 19328 -19329  19330  99 -19332 0
 19328 -19329  19330  99  19333 0

c  1-1 --> 0
c    (-b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧  b^{99, 1}_0 ∧ -p_99) -> (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧ -b^{99, 2}_0)
c  in CNF:
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_2
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_1
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_0
c  in DIMACS:
 19328  19329 -19330  99 -19331 0
 19328  19329 -19330  99 -19332 0
 19328  19329 -19330  99 -19333 0

c  0-1 --> -1
c    (-b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧ -p_99) -> ( b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0)
c  in CNF:
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨  b^{99, 2}_2
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_1
c     b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨  b^{99, 2}_0
c  in DIMACS:
 19328  19329  19330  99  19331 0
 19328  19329  19330  99 -19332 0
 19328  19329  19330  99  19333 0

c  -1-1 --> -2
c    ( b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧  b^{99, 1}_0 ∧ -p_99) -> ( b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0)
c  in CNF:
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨  b^{99, 2}_2
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨  b^{99, 2}_1
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨  p_99 ∨ -b^{99, 2}_0
c  in DIMACS:
-19328  19329 -19330  99  19331 0
-19328  19329 -19330  99  19332 0
-19328  19329 -19330  99 -19333 0

c  -2-1 --> break 
c    ( b^{99, 1}_2 ∧  b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧ -p_99) -> break
c  in CNF:
c    -b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨  b^{99, 1}_0 ∨  p_99 ∨ break
c  in DIMACS:
-19328 -19329  19330  99 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 1}_2 ∧ -b^{99, 1}_1 ∧ -b^{99, 1}_0 ∧ true) 
c  in CNF:
c    -b^{99, 1}_2 ∨  b^{99, 1}_1 ∨  b^{99, 1}_0 ∨ false 
c  in DIMACS:
-19328  19329  19330  0

c  3 does not represent an automaton state.
c    -(-b^{99, 1}_2 ∧  b^{99, 1}_1 ∧  b^{99, 1}_0 ∧ true) 
c  in CNF:
c     b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ false 
c  in DIMACS:
 19328 -19329 -19330  0
c  -3 does not represent an automaton state.
c    -( b^{99, 1}_2 ∧  b^{99, 1}_1 ∧  b^{99, 1}_0 ∧ true) 
c  in CNF:
c    -b^{99, 1}_2 ∨ -b^{99, 1}_1 ∨ -b^{99, 1}_0 ∨ false 
c  in DIMACS:
-19328 -19329 -19330  0

c i = 2
c  -2+1 --> -1
c    ( b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧  p_198) -> ( b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0)
c  in CNF:
c    -b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨  b^{99, 3}_2
c    -b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_1
c    -b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨  b^{99, 3}_0
c  in DIMACS:
-19331 -19332  19333 -198  19334 0
-19331 -19332  19333 -198 -19335 0
-19331 -19332  19333 -198  19336 0

c  -1+1 --> 0
c    ( b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0 ∧  p_198) -> (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧ -b^{99, 3}_0)
c  in CNF:
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_2
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_1
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_0
c  in DIMACS:
-19331  19332 -19333 -198 -19334 0
-19331  19332 -19333 -198 -19335 0
-19331  19332 -19333 -198 -19336 0

c  0+1 --> 1
c    (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧  p_198) -> (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0)
c  in CNF:
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_2
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_1
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨  b^{99, 3}_0
c  in DIMACS:
 19331  19332  19333 -198 -19334 0
 19331  19332  19333 -198 -19335 0
 19331  19332  19333 -198  19336 0

c  1+1 --> 2
c    (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0 ∧  p_198) -> (-b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0)
c  in CNF:
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_2
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨  b^{99, 3}_1
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ -p_198 ∨ -b^{99, 3}_0
c  in DIMACS:
 19331  19332 -19333 -198 -19334 0
 19331  19332 -19333 -198  19335 0
 19331  19332 -19333 -198 -19336 0

c  2+1 --> break 
c    (-b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧  p_198) -> break
c  in CNF:
c     b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 19331 -19332  19333 -198 1162 0


c  2-1 --> 1
c    (-b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧ -p_198) -> (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0)
c  in CNF:
c     b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_2
c     b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_1
c     b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨  b^{99, 3}_0
c  in DIMACS:
 19331 -19332  19333  198 -19334 0
 19331 -19332  19333  198 -19335 0
 19331 -19332  19333  198  19336 0

c  1-1 --> 0
c    (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0 ∧ -p_198) -> (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧ -b^{99, 3}_0)
c  in CNF:
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_2
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_1
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_0
c  in DIMACS:
 19331  19332 -19333  198 -19334 0
 19331  19332 -19333  198 -19335 0
 19331  19332 -19333  198 -19336 0

c  0-1 --> -1
c    (-b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧ -p_198) -> ( b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0)
c  in CNF:
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨  b^{99, 3}_2
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_1
c     b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨  b^{99, 3}_0
c  in DIMACS:
 19331  19332  19333  198  19334 0
 19331  19332  19333  198 -19335 0
 19331  19332  19333  198  19336 0

c  -1-1 --> -2
c    ( b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧  b^{99, 2}_0 ∧ -p_198) -> ( b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0)
c  in CNF:
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨  b^{99, 3}_2
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨  b^{99, 3}_1
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨  p_198 ∨ -b^{99, 3}_0
c  in DIMACS:
-19331  19332 -19333  198  19334 0
-19331  19332 -19333  198  19335 0
-19331  19332 -19333  198 -19336 0

c  -2-1 --> break 
c    ( b^{99, 2}_2 ∧  b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨  b^{99, 2}_0 ∨  p_198 ∨ break
c  in DIMACS:
-19331 -19332  19333  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 2}_2 ∧ -b^{99, 2}_1 ∧ -b^{99, 2}_0 ∧ true) 
c  in CNF:
c    -b^{99, 2}_2 ∨  b^{99, 2}_1 ∨  b^{99, 2}_0 ∨ false 
c  in DIMACS:
-19331  19332  19333  0

c  3 does not represent an automaton state.
c    -(-b^{99, 2}_2 ∧  b^{99, 2}_1 ∧  b^{99, 2}_0 ∧ true) 
c  in CNF:
c     b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ false 
c  in DIMACS:
 19331 -19332 -19333  0
c  -3 does not represent an automaton state.
c    -( b^{99, 2}_2 ∧  b^{99, 2}_1 ∧  b^{99, 2}_0 ∧ true) 
c  in CNF:
c    -b^{99, 2}_2 ∨ -b^{99, 2}_1 ∨ -b^{99, 2}_0 ∨ false 
c  in DIMACS:
-19331 -19332 -19333  0

c i = 3
c  -2+1 --> -1
c    ( b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧  p_297) -> ( b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0)
c  in CNF:
c    -b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨  b^{99, 4}_2
c    -b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_1
c    -b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨  b^{99, 4}_0
c  in DIMACS:
-19334 -19335  19336 -297  19337 0
-19334 -19335  19336 -297 -19338 0
-19334 -19335  19336 -297  19339 0

c  -1+1 --> 0
c    ( b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0 ∧  p_297) -> (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧ -b^{99, 4}_0)
c  in CNF:
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_2
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_1
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_0
c  in DIMACS:
-19334  19335 -19336 -297 -19337 0
-19334  19335 -19336 -297 -19338 0
-19334  19335 -19336 -297 -19339 0

c  0+1 --> 1
c    (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧  p_297) -> (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0)
c  in CNF:
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_2
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_1
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨  b^{99, 4}_0
c  in DIMACS:
 19334  19335  19336 -297 -19337 0
 19334  19335  19336 -297 -19338 0
 19334  19335  19336 -297  19339 0

c  1+1 --> 2
c    (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0 ∧  p_297) -> (-b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0)
c  in CNF:
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_2
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨  b^{99, 4}_1
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ -p_297 ∨ -b^{99, 4}_0
c  in DIMACS:
 19334  19335 -19336 -297 -19337 0
 19334  19335 -19336 -297  19338 0
 19334  19335 -19336 -297 -19339 0

c  2+1 --> break 
c    (-b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧  p_297) -> break
c  in CNF:
c     b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 19334 -19335  19336 -297 1162 0


c  2-1 --> 1
c    (-b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧ -p_297) -> (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0)
c  in CNF:
c     b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_2
c     b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_1
c     b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨  b^{99, 4}_0
c  in DIMACS:
 19334 -19335  19336  297 -19337 0
 19334 -19335  19336  297 -19338 0
 19334 -19335  19336  297  19339 0

c  1-1 --> 0
c    (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0 ∧ -p_297) -> (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧ -b^{99, 4}_0)
c  in CNF:
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_2
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_1
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_0
c  in DIMACS:
 19334  19335 -19336  297 -19337 0
 19334  19335 -19336  297 -19338 0
 19334  19335 -19336  297 -19339 0

c  0-1 --> -1
c    (-b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧ -p_297) -> ( b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0)
c  in CNF:
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨  b^{99, 4}_2
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_1
c     b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨  b^{99, 4}_0
c  in DIMACS:
 19334  19335  19336  297  19337 0
 19334  19335  19336  297 -19338 0
 19334  19335  19336  297  19339 0

c  -1-1 --> -2
c    ( b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧  b^{99, 3}_0 ∧ -p_297) -> ( b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0)
c  in CNF:
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨  b^{99, 4}_2
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨  b^{99, 4}_1
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨  p_297 ∨ -b^{99, 4}_0
c  in DIMACS:
-19334  19335 -19336  297  19337 0
-19334  19335 -19336  297  19338 0
-19334  19335 -19336  297 -19339 0

c  -2-1 --> break 
c    ( b^{99, 3}_2 ∧  b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨  b^{99, 3}_0 ∨  p_297 ∨ break
c  in DIMACS:
-19334 -19335  19336  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 3}_2 ∧ -b^{99, 3}_1 ∧ -b^{99, 3}_0 ∧ true) 
c  in CNF:
c    -b^{99, 3}_2 ∨  b^{99, 3}_1 ∨  b^{99, 3}_0 ∨ false 
c  in DIMACS:
-19334  19335  19336  0

c  3 does not represent an automaton state.
c    -(-b^{99, 3}_2 ∧  b^{99, 3}_1 ∧  b^{99, 3}_0 ∧ true) 
c  in CNF:
c     b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ false 
c  in DIMACS:
 19334 -19335 -19336  0
c  -3 does not represent an automaton state.
c    -( b^{99, 3}_2 ∧  b^{99, 3}_1 ∧  b^{99, 3}_0 ∧ true) 
c  in CNF:
c    -b^{99, 3}_2 ∨ -b^{99, 3}_1 ∨ -b^{99, 3}_0 ∨ false 
c  in DIMACS:
-19334 -19335 -19336  0

c i = 4
c  -2+1 --> -1
c    ( b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧  p_396) -> ( b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0)
c  in CNF:
c    -b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨  b^{99, 5}_2
c    -b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_1
c    -b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨  b^{99, 5}_0
c  in DIMACS:
-19337 -19338  19339 -396  19340 0
-19337 -19338  19339 -396 -19341 0
-19337 -19338  19339 -396  19342 0

c  -1+1 --> 0
c    ( b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0 ∧  p_396) -> (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧ -b^{99, 5}_0)
c  in CNF:
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_2
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_1
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_0
c  in DIMACS:
-19337  19338 -19339 -396 -19340 0
-19337  19338 -19339 -396 -19341 0
-19337  19338 -19339 -396 -19342 0

c  0+1 --> 1
c    (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧  p_396) -> (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0)
c  in CNF:
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_2
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_1
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨  b^{99, 5}_0
c  in DIMACS:
 19337  19338  19339 -396 -19340 0
 19337  19338  19339 -396 -19341 0
 19337  19338  19339 -396  19342 0

c  1+1 --> 2
c    (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0 ∧  p_396) -> (-b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0)
c  in CNF:
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_2
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨  b^{99, 5}_1
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ -p_396 ∨ -b^{99, 5}_0
c  in DIMACS:
 19337  19338 -19339 -396 -19340 0
 19337  19338 -19339 -396  19341 0
 19337  19338 -19339 -396 -19342 0

c  2+1 --> break 
c    (-b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧  p_396) -> break
c  in CNF:
c     b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 19337 -19338  19339 -396 1162 0


c  2-1 --> 1
c    (-b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧ -p_396) -> (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0)
c  in CNF:
c     b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_2
c     b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_1
c     b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨  b^{99, 5}_0
c  in DIMACS:
 19337 -19338  19339  396 -19340 0
 19337 -19338  19339  396 -19341 0
 19337 -19338  19339  396  19342 0

c  1-1 --> 0
c    (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0 ∧ -p_396) -> (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧ -b^{99, 5}_0)
c  in CNF:
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_2
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_1
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_0
c  in DIMACS:
 19337  19338 -19339  396 -19340 0
 19337  19338 -19339  396 -19341 0
 19337  19338 -19339  396 -19342 0

c  0-1 --> -1
c    (-b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧ -p_396) -> ( b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0)
c  in CNF:
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨  b^{99, 5}_2
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_1
c     b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨  b^{99, 5}_0
c  in DIMACS:
 19337  19338  19339  396  19340 0
 19337  19338  19339  396 -19341 0
 19337  19338  19339  396  19342 0

c  -1-1 --> -2
c    ( b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧  b^{99, 4}_0 ∧ -p_396) -> ( b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0)
c  in CNF:
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨  b^{99, 5}_2
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨  b^{99, 5}_1
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨  p_396 ∨ -b^{99, 5}_0
c  in DIMACS:
-19337  19338 -19339  396  19340 0
-19337  19338 -19339  396  19341 0
-19337  19338 -19339  396 -19342 0

c  -2-1 --> break 
c    ( b^{99, 4}_2 ∧  b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨  b^{99, 4}_0 ∨  p_396 ∨ break
c  in DIMACS:
-19337 -19338  19339  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 4}_2 ∧ -b^{99, 4}_1 ∧ -b^{99, 4}_0 ∧ true) 
c  in CNF:
c    -b^{99, 4}_2 ∨  b^{99, 4}_1 ∨  b^{99, 4}_0 ∨ false 
c  in DIMACS:
-19337  19338  19339  0

c  3 does not represent an automaton state.
c    -(-b^{99, 4}_2 ∧  b^{99, 4}_1 ∧  b^{99, 4}_0 ∧ true) 
c  in CNF:
c     b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ false 
c  in DIMACS:
 19337 -19338 -19339  0
c  -3 does not represent an automaton state.
c    -( b^{99, 4}_2 ∧  b^{99, 4}_1 ∧  b^{99, 4}_0 ∧ true) 
c  in CNF:
c    -b^{99, 4}_2 ∨ -b^{99, 4}_1 ∨ -b^{99, 4}_0 ∨ false 
c  in DIMACS:
-19337 -19338 -19339  0

c i = 5
c  -2+1 --> -1
c    ( b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧  p_495) -> ( b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0)
c  in CNF:
c    -b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨  b^{99, 6}_2
c    -b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_1
c    -b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨  b^{99, 6}_0
c  in DIMACS:
-19340 -19341  19342 -495  19343 0
-19340 -19341  19342 -495 -19344 0
-19340 -19341  19342 -495  19345 0

c  -1+1 --> 0
c    ( b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0 ∧  p_495) -> (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧ -b^{99, 6}_0)
c  in CNF:
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_2
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_1
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_0
c  in DIMACS:
-19340  19341 -19342 -495 -19343 0
-19340  19341 -19342 -495 -19344 0
-19340  19341 -19342 -495 -19345 0

c  0+1 --> 1
c    (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧  p_495) -> (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0)
c  in CNF:
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_2
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_1
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨  b^{99, 6}_0
c  in DIMACS:
 19340  19341  19342 -495 -19343 0
 19340  19341  19342 -495 -19344 0
 19340  19341  19342 -495  19345 0

c  1+1 --> 2
c    (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0 ∧  p_495) -> (-b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0)
c  in CNF:
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_2
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨  b^{99, 6}_1
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ -p_495 ∨ -b^{99, 6}_0
c  in DIMACS:
 19340  19341 -19342 -495 -19343 0
 19340  19341 -19342 -495  19344 0
 19340  19341 -19342 -495 -19345 0

c  2+1 --> break 
c    (-b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧  p_495) -> break
c  in CNF:
c     b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 19340 -19341  19342 -495 1162 0


c  2-1 --> 1
c    (-b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧ -p_495) -> (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0)
c  in CNF:
c     b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_2
c     b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_1
c     b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨  b^{99, 6}_0
c  in DIMACS:
 19340 -19341  19342  495 -19343 0
 19340 -19341  19342  495 -19344 0
 19340 -19341  19342  495  19345 0

c  1-1 --> 0
c    (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0 ∧ -p_495) -> (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧ -b^{99, 6}_0)
c  in CNF:
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_2
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_1
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_0
c  in DIMACS:
 19340  19341 -19342  495 -19343 0
 19340  19341 -19342  495 -19344 0
 19340  19341 -19342  495 -19345 0

c  0-1 --> -1
c    (-b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧ -p_495) -> ( b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0)
c  in CNF:
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨  b^{99, 6}_2
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_1
c     b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨  b^{99, 6}_0
c  in DIMACS:
 19340  19341  19342  495  19343 0
 19340  19341  19342  495 -19344 0
 19340  19341  19342  495  19345 0

c  -1-1 --> -2
c    ( b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧  b^{99, 5}_0 ∧ -p_495) -> ( b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0)
c  in CNF:
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨  b^{99, 6}_2
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨  b^{99, 6}_1
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨  p_495 ∨ -b^{99, 6}_0
c  in DIMACS:
-19340  19341 -19342  495  19343 0
-19340  19341 -19342  495  19344 0
-19340  19341 -19342  495 -19345 0

c  -2-1 --> break 
c    ( b^{99, 5}_2 ∧  b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨  b^{99, 5}_0 ∨  p_495 ∨ break
c  in DIMACS:
-19340 -19341  19342  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 5}_2 ∧ -b^{99, 5}_1 ∧ -b^{99, 5}_0 ∧ true) 
c  in CNF:
c    -b^{99, 5}_2 ∨  b^{99, 5}_1 ∨  b^{99, 5}_0 ∨ false 
c  in DIMACS:
-19340  19341  19342  0

c  3 does not represent an automaton state.
c    -(-b^{99, 5}_2 ∧  b^{99, 5}_1 ∧  b^{99, 5}_0 ∧ true) 
c  in CNF:
c     b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ false 
c  in DIMACS:
 19340 -19341 -19342  0
c  -3 does not represent an automaton state.
c    -( b^{99, 5}_2 ∧  b^{99, 5}_1 ∧  b^{99, 5}_0 ∧ true) 
c  in CNF:
c    -b^{99, 5}_2 ∨ -b^{99, 5}_1 ∨ -b^{99, 5}_0 ∨ false 
c  in DIMACS:
-19340 -19341 -19342  0

c i = 6
c  -2+1 --> -1
c    ( b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧  p_594) -> ( b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0)
c  in CNF:
c    -b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨  b^{99, 7}_2
c    -b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_1
c    -b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨  b^{99, 7}_0
c  in DIMACS:
-19343 -19344  19345 -594  19346 0
-19343 -19344  19345 -594 -19347 0
-19343 -19344  19345 -594  19348 0

c  -1+1 --> 0
c    ( b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0 ∧  p_594) -> (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧ -b^{99, 7}_0)
c  in CNF:
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_2
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_1
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_0
c  in DIMACS:
-19343  19344 -19345 -594 -19346 0
-19343  19344 -19345 -594 -19347 0
-19343  19344 -19345 -594 -19348 0

c  0+1 --> 1
c    (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧  p_594) -> (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0)
c  in CNF:
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_2
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_1
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨  b^{99, 7}_0
c  in DIMACS:
 19343  19344  19345 -594 -19346 0
 19343  19344  19345 -594 -19347 0
 19343  19344  19345 -594  19348 0

c  1+1 --> 2
c    (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0 ∧  p_594) -> (-b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0)
c  in CNF:
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_2
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨  b^{99, 7}_1
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ -p_594 ∨ -b^{99, 7}_0
c  in DIMACS:
 19343  19344 -19345 -594 -19346 0
 19343  19344 -19345 -594  19347 0
 19343  19344 -19345 -594 -19348 0

c  2+1 --> break 
c    (-b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧  p_594) -> break
c  in CNF:
c     b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 19343 -19344  19345 -594 1162 0


c  2-1 --> 1
c    (-b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧ -p_594) -> (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0)
c  in CNF:
c     b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_2
c     b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_1
c     b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨  b^{99, 7}_0
c  in DIMACS:
 19343 -19344  19345  594 -19346 0
 19343 -19344  19345  594 -19347 0
 19343 -19344  19345  594  19348 0

c  1-1 --> 0
c    (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0 ∧ -p_594) -> (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧ -b^{99, 7}_0)
c  in CNF:
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_2
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_1
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_0
c  in DIMACS:
 19343  19344 -19345  594 -19346 0
 19343  19344 -19345  594 -19347 0
 19343  19344 -19345  594 -19348 0

c  0-1 --> -1
c    (-b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧ -p_594) -> ( b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0)
c  in CNF:
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨  b^{99, 7}_2
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_1
c     b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨  b^{99, 7}_0
c  in DIMACS:
 19343  19344  19345  594  19346 0
 19343  19344  19345  594 -19347 0
 19343  19344  19345  594  19348 0

c  -1-1 --> -2
c    ( b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧  b^{99, 6}_0 ∧ -p_594) -> ( b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0)
c  in CNF:
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨  b^{99, 7}_2
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨  b^{99, 7}_1
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨  p_594 ∨ -b^{99, 7}_0
c  in DIMACS:
-19343  19344 -19345  594  19346 0
-19343  19344 -19345  594  19347 0
-19343  19344 -19345  594 -19348 0

c  -2-1 --> break 
c    ( b^{99, 6}_2 ∧  b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨  b^{99, 6}_0 ∨  p_594 ∨ break
c  in DIMACS:
-19343 -19344  19345  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 6}_2 ∧ -b^{99, 6}_1 ∧ -b^{99, 6}_0 ∧ true) 
c  in CNF:
c    -b^{99, 6}_2 ∨  b^{99, 6}_1 ∨  b^{99, 6}_0 ∨ false 
c  in DIMACS:
-19343  19344  19345  0

c  3 does not represent an automaton state.
c    -(-b^{99, 6}_2 ∧  b^{99, 6}_1 ∧  b^{99, 6}_0 ∧ true) 
c  in CNF:
c     b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ false 
c  in DIMACS:
 19343 -19344 -19345  0
c  -3 does not represent an automaton state.
c    -( b^{99, 6}_2 ∧  b^{99, 6}_1 ∧  b^{99, 6}_0 ∧ true) 
c  in CNF:
c    -b^{99, 6}_2 ∨ -b^{99, 6}_1 ∨ -b^{99, 6}_0 ∨ false 
c  in DIMACS:
-19343 -19344 -19345  0

c i = 7
c  -2+1 --> -1
c    ( b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧  p_693) -> ( b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0)
c  in CNF:
c    -b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨  b^{99, 8}_2
c    -b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_1
c    -b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨  b^{99, 8}_0
c  in DIMACS:
-19346 -19347  19348 -693  19349 0
-19346 -19347  19348 -693 -19350 0
-19346 -19347  19348 -693  19351 0

c  -1+1 --> 0
c    ( b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0 ∧  p_693) -> (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧ -b^{99, 8}_0)
c  in CNF:
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_2
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_1
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_0
c  in DIMACS:
-19346  19347 -19348 -693 -19349 0
-19346  19347 -19348 -693 -19350 0
-19346  19347 -19348 -693 -19351 0

c  0+1 --> 1
c    (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧  p_693) -> (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0)
c  in CNF:
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_2
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_1
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨  b^{99, 8}_0
c  in DIMACS:
 19346  19347  19348 -693 -19349 0
 19346  19347  19348 -693 -19350 0
 19346  19347  19348 -693  19351 0

c  1+1 --> 2
c    (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0 ∧  p_693) -> (-b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0)
c  in CNF:
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_2
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨  b^{99, 8}_1
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ -p_693 ∨ -b^{99, 8}_0
c  in DIMACS:
 19346  19347 -19348 -693 -19349 0
 19346  19347 -19348 -693  19350 0
 19346  19347 -19348 -693 -19351 0

c  2+1 --> break 
c    (-b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧  p_693) -> break
c  in CNF:
c     b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 19346 -19347  19348 -693 1162 0


c  2-1 --> 1
c    (-b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧ -p_693) -> (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0)
c  in CNF:
c     b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_2
c     b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_1
c     b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨  b^{99, 8}_0
c  in DIMACS:
 19346 -19347  19348  693 -19349 0
 19346 -19347  19348  693 -19350 0
 19346 -19347  19348  693  19351 0

c  1-1 --> 0
c    (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0 ∧ -p_693) -> (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧ -b^{99, 8}_0)
c  in CNF:
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_2
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_1
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_0
c  in DIMACS:
 19346  19347 -19348  693 -19349 0
 19346  19347 -19348  693 -19350 0
 19346  19347 -19348  693 -19351 0

c  0-1 --> -1
c    (-b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧ -p_693) -> ( b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0)
c  in CNF:
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨  b^{99, 8}_2
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_1
c     b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨  b^{99, 8}_0
c  in DIMACS:
 19346  19347  19348  693  19349 0
 19346  19347  19348  693 -19350 0
 19346  19347  19348  693  19351 0

c  -1-1 --> -2
c    ( b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧  b^{99, 7}_0 ∧ -p_693) -> ( b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0)
c  in CNF:
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨  b^{99, 8}_2
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨  b^{99, 8}_1
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨  p_693 ∨ -b^{99, 8}_0
c  in DIMACS:
-19346  19347 -19348  693  19349 0
-19346  19347 -19348  693  19350 0
-19346  19347 -19348  693 -19351 0

c  -2-1 --> break 
c    ( b^{99, 7}_2 ∧  b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨  b^{99, 7}_0 ∨  p_693 ∨ break
c  in DIMACS:
-19346 -19347  19348  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 7}_2 ∧ -b^{99, 7}_1 ∧ -b^{99, 7}_0 ∧ true) 
c  in CNF:
c    -b^{99, 7}_2 ∨  b^{99, 7}_1 ∨  b^{99, 7}_0 ∨ false 
c  in DIMACS:
-19346  19347  19348  0

c  3 does not represent an automaton state.
c    -(-b^{99, 7}_2 ∧  b^{99, 7}_1 ∧  b^{99, 7}_0 ∧ true) 
c  in CNF:
c     b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ false 
c  in DIMACS:
 19346 -19347 -19348  0
c  -3 does not represent an automaton state.
c    -( b^{99, 7}_2 ∧  b^{99, 7}_1 ∧  b^{99, 7}_0 ∧ true) 
c  in CNF:
c    -b^{99, 7}_2 ∨ -b^{99, 7}_1 ∨ -b^{99, 7}_0 ∨ false 
c  in DIMACS:
-19346 -19347 -19348  0

c i = 8
c  -2+1 --> -1
c    ( b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧  p_792) -> ( b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0)
c  in CNF:
c    -b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨  b^{99, 9}_2
c    -b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_1
c    -b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨  b^{99, 9}_0
c  in DIMACS:
-19349 -19350  19351 -792  19352 0
-19349 -19350  19351 -792 -19353 0
-19349 -19350  19351 -792  19354 0

c  -1+1 --> 0
c    ( b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0 ∧  p_792) -> (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧ -b^{99, 9}_0)
c  in CNF:
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_2
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_1
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_0
c  in DIMACS:
-19349  19350 -19351 -792 -19352 0
-19349  19350 -19351 -792 -19353 0
-19349  19350 -19351 -792 -19354 0

c  0+1 --> 1
c    (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧  p_792) -> (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0)
c  in CNF:
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_2
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_1
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨  b^{99, 9}_0
c  in DIMACS:
 19349  19350  19351 -792 -19352 0
 19349  19350  19351 -792 -19353 0
 19349  19350  19351 -792  19354 0

c  1+1 --> 2
c    (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0 ∧  p_792) -> (-b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0)
c  in CNF:
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_2
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨  b^{99, 9}_1
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ -p_792 ∨ -b^{99, 9}_0
c  in DIMACS:
 19349  19350 -19351 -792 -19352 0
 19349  19350 -19351 -792  19353 0
 19349  19350 -19351 -792 -19354 0

c  2+1 --> break 
c    (-b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧  p_792) -> break
c  in CNF:
c     b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 19349 -19350  19351 -792 1162 0


c  2-1 --> 1
c    (-b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧ -p_792) -> (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0)
c  in CNF:
c     b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_2
c     b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_1
c     b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨  b^{99, 9}_0
c  in DIMACS:
 19349 -19350  19351  792 -19352 0
 19349 -19350  19351  792 -19353 0
 19349 -19350  19351  792  19354 0

c  1-1 --> 0
c    (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0 ∧ -p_792) -> (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧ -b^{99, 9}_0)
c  in CNF:
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_2
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_1
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_0
c  in DIMACS:
 19349  19350 -19351  792 -19352 0
 19349  19350 -19351  792 -19353 0
 19349  19350 -19351  792 -19354 0

c  0-1 --> -1
c    (-b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧ -p_792) -> ( b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0)
c  in CNF:
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨  b^{99, 9}_2
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_1
c     b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨  b^{99, 9}_0
c  in DIMACS:
 19349  19350  19351  792  19352 0
 19349  19350  19351  792 -19353 0
 19349  19350  19351  792  19354 0

c  -1-1 --> -2
c    ( b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧  b^{99, 8}_0 ∧ -p_792) -> ( b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0)
c  in CNF:
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨  b^{99, 9}_2
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨  b^{99, 9}_1
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨  p_792 ∨ -b^{99, 9}_0
c  in DIMACS:
-19349  19350 -19351  792  19352 0
-19349  19350 -19351  792  19353 0
-19349  19350 -19351  792 -19354 0

c  -2-1 --> break 
c    ( b^{99, 8}_2 ∧  b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨  b^{99, 8}_0 ∨  p_792 ∨ break
c  in DIMACS:
-19349 -19350  19351  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 8}_2 ∧ -b^{99, 8}_1 ∧ -b^{99, 8}_0 ∧ true) 
c  in CNF:
c    -b^{99, 8}_2 ∨  b^{99, 8}_1 ∨  b^{99, 8}_0 ∨ false 
c  in DIMACS:
-19349  19350  19351  0

c  3 does not represent an automaton state.
c    -(-b^{99, 8}_2 ∧  b^{99, 8}_1 ∧  b^{99, 8}_0 ∧ true) 
c  in CNF:
c     b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ false 
c  in DIMACS:
 19349 -19350 -19351  0
c  -3 does not represent an automaton state.
c    -( b^{99, 8}_2 ∧  b^{99, 8}_1 ∧  b^{99, 8}_0 ∧ true) 
c  in CNF:
c    -b^{99, 8}_2 ∨ -b^{99, 8}_1 ∨ -b^{99, 8}_0 ∨ false 
c  in DIMACS:
-19349 -19350 -19351  0

c i = 9
c  -2+1 --> -1
c    ( b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧  p_891) -> ( b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0)
c  in CNF:
c    -b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨  b^{99, 10}_2
c    -b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_1
c    -b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨  b^{99, 10}_0
c  in DIMACS:
-19352 -19353  19354 -891  19355 0
-19352 -19353  19354 -891 -19356 0
-19352 -19353  19354 -891  19357 0

c  -1+1 --> 0
c    ( b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0 ∧  p_891) -> (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧ -b^{99, 10}_0)
c  in CNF:
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_2
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_1
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_0
c  in DIMACS:
-19352  19353 -19354 -891 -19355 0
-19352  19353 -19354 -891 -19356 0
-19352  19353 -19354 -891 -19357 0

c  0+1 --> 1
c    (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧  p_891) -> (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0)
c  in CNF:
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_2
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_1
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨  b^{99, 10}_0
c  in DIMACS:
 19352  19353  19354 -891 -19355 0
 19352  19353  19354 -891 -19356 0
 19352  19353  19354 -891  19357 0

c  1+1 --> 2
c    (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0 ∧  p_891) -> (-b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0)
c  in CNF:
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_2
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨  b^{99, 10}_1
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ -p_891 ∨ -b^{99, 10}_0
c  in DIMACS:
 19352  19353 -19354 -891 -19355 0
 19352  19353 -19354 -891  19356 0
 19352  19353 -19354 -891 -19357 0

c  2+1 --> break 
c    (-b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧  p_891) -> break
c  in CNF:
c     b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 19352 -19353  19354 -891 1162 0


c  2-1 --> 1
c    (-b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧ -p_891) -> (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0)
c  in CNF:
c     b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_2
c     b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_1
c     b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨  b^{99, 10}_0
c  in DIMACS:
 19352 -19353  19354  891 -19355 0
 19352 -19353  19354  891 -19356 0
 19352 -19353  19354  891  19357 0

c  1-1 --> 0
c    (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0 ∧ -p_891) -> (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧ -b^{99, 10}_0)
c  in CNF:
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_2
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_1
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_0
c  in DIMACS:
 19352  19353 -19354  891 -19355 0
 19352  19353 -19354  891 -19356 0
 19352  19353 -19354  891 -19357 0

c  0-1 --> -1
c    (-b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧ -p_891) -> ( b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0)
c  in CNF:
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨  b^{99, 10}_2
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_1
c     b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨  b^{99, 10}_0
c  in DIMACS:
 19352  19353  19354  891  19355 0
 19352  19353  19354  891 -19356 0
 19352  19353  19354  891  19357 0

c  -1-1 --> -2
c    ( b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧  b^{99, 9}_0 ∧ -p_891) -> ( b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0)
c  in CNF:
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨  b^{99, 10}_2
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨  b^{99, 10}_1
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨  p_891 ∨ -b^{99, 10}_0
c  in DIMACS:
-19352  19353 -19354  891  19355 0
-19352  19353 -19354  891  19356 0
-19352  19353 -19354  891 -19357 0

c  -2-1 --> break 
c    ( b^{99, 9}_2 ∧  b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨  b^{99, 9}_0 ∨  p_891 ∨ break
c  in DIMACS:
-19352 -19353  19354  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 9}_2 ∧ -b^{99, 9}_1 ∧ -b^{99, 9}_0 ∧ true) 
c  in CNF:
c    -b^{99, 9}_2 ∨  b^{99, 9}_1 ∨  b^{99, 9}_0 ∨ false 
c  in DIMACS:
-19352  19353  19354  0

c  3 does not represent an automaton state.
c    -(-b^{99, 9}_2 ∧  b^{99, 9}_1 ∧  b^{99, 9}_0 ∧ true) 
c  in CNF:
c     b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ false 
c  in DIMACS:
 19352 -19353 -19354  0
c  -3 does not represent an automaton state.
c    -( b^{99, 9}_2 ∧  b^{99, 9}_1 ∧  b^{99, 9}_0 ∧ true) 
c  in CNF:
c    -b^{99, 9}_2 ∨ -b^{99, 9}_1 ∨ -b^{99, 9}_0 ∨ false 
c  in DIMACS:
-19352 -19353 -19354  0

c i = 10
c  -2+1 --> -1
c    ( b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧  p_990) -> ( b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0)
c  in CNF:
c    -b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨  b^{99, 11}_2
c    -b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_1
c    -b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨  b^{99, 11}_0
c  in DIMACS:
-19355 -19356  19357 -990  19358 0
-19355 -19356  19357 -990 -19359 0
-19355 -19356  19357 -990  19360 0

c  -1+1 --> 0
c    ( b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0 ∧  p_990) -> (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧ -b^{99, 11}_0)
c  in CNF:
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_2
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_1
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_0
c  in DIMACS:
-19355  19356 -19357 -990 -19358 0
-19355  19356 -19357 -990 -19359 0
-19355  19356 -19357 -990 -19360 0

c  0+1 --> 1
c    (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧  p_990) -> (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0)
c  in CNF:
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_2
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_1
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨  b^{99, 11}_0
c  in DIMACS:
 19355  19356  19357 -990 -19358 0
 19355  19356  19357 -990 -19359 0
 19355  19356  19357 -990  19360 0

c  1+1 --> 2
c    (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0 ∧  p_990) -> (-b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0)
c  in CNF:
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_2
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨  b^{99, 11}_1
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ -p_990 ∨ -b^{99, 11}_0
c  in DIMACS:
 19355  19356 -19357 -990 -19358 0
 19355  19356 -19357 -990  19359 0
 19355  19356 -19357 -990 -19360 0

c  2+1 --> break 
c    (-b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧  p_990) -> break
c  in CNF:
c     b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 19355 -19356  19357 -990 1162 0


c  2-1 --> 1
c    (-b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧ -p_990) -> (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0)
c  in CNF:
c     b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_2
c     b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_1
c     b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨  b^{99, 11}_0
c  in DIMACS:
 19355 -19356  19357  990 -19358 0
 19355 -19356  19357  990 -19359 0
 19355 -19356  19357  990  19360 0

c  1-1 --> 0
c    (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0 ∧ -p_990) -> (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧ -b^{99, 11}_0)
c  in CNF:
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_2
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_1
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_0
c  in DIMACS:
 19355  19356 -19357  990 -19358 0
 19355  19356 -19357  990 -19359 0
 19355  19356 -19357  990 -19360 0

c  0-1 --> -1
c    (-b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧ -p_990) -> ( b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0)
c  in CNF:
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨  b^{99, 11}_2
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_1
c     b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨  b^{99, 11}_0
c  in DIMACS:
 19355  19356  19357  990  19358 0
 19355  19356  19357  990 -19359 0
 19355  19356  19357  990  19360 0

c  -1-1 --> -2
c    ( b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧  b^{99, 10}_0 ∧ -p_990) -> ( b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0)
c  in CNF:
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨  b^{99, 11}_2
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨  b^{99, 11}_1
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨  p_990 ∨ -b^{99, 11}_0
c  in DIMACS:
-19355  19356 -19357  990  19358 0
-19355  19356 -19357  990  19359 0
-19355  19356 -19357  990 -19360 0

c  -2-1 --> break 
c    ( b^{99, 10}_2 ∧  b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨  b^{99, 10}_0 ∨  p_990 ∨ break
c  in DIMACS:
-19355 -19356  19357  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 10}_2 ∧ -b^{99, 10}_1 ∧ -b^{99, 10}_0 ∧ true) 
c  in CNF:
c    -b^{99, 10}_2 ∨  b^{99, 10}_1 ∨  b^{99, 10}_0 ∨ false 
c  in DIMACS:
-19355  19356  19357  0

c  3 does not represent an automaton state.
c    -(-b^{99, 10}_2 ∧  b^{99, 10}_1 ∧  b^{99, 10}_0 ∧ true) 
c  in CNF:
c     b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ false 
c  in DIMACS:
 19355 -19356 -19357  0
c  -3 does not represent an automaton state.
c    -( b^{99, 10}_2 ∧  b^{99, 10}_1 ∧  b^{99, 10}_0 ∧ true) 
c  in CNF:
c    -b^{99, 10}_2 ∨ -b^{99, 10}_1 ∨ -b^{99, 10}_0 ∨ false 
c  in DIMACS:
-19355 -19356 -19357  0

c i = 11
c  -2+1 --> -1
c    ( b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧  p_1089) -> ( b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧  b^{99, 12}_0)
c  in CNF:
c    -b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨  b^{99, 12}_2
c    -b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_1
c    -b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨  b^{99, 12}_0
c  in DIMACS:
-19358 -19359  19360 -1089  19361 0
-19358 -19359  19360 -1089 -19362 0
-19358 -19359  19360 -1089  19363 0

c  -1+1 --> 0
c    ( b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0 ∧  p_1089) -> (-b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧ -b^{99, 12}_0)
c  in CNF:
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_2
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_1
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_0
c  in DIMACS:
-19358  19359 -19360 -1089 -19361 0
-19358  19359 -19360 -1089 -19362 0
-19358  19359 -19360 -1089 -19363 0

c  0+1 --> 1
c    (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧  p_1089) -> (-b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧  b^{99, 12}_0)
c  in CNF:
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_2
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_1
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨  b^{99, 12}_0
c  in DIMACS:
 19358  19359  19360 -1089 -19361 0
 19358  19359  19360 -1089 -19362 0
 19358  19359  19360 -1089  19363 0

c  1+1 --> 2
c    (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0 ∧  p_1089) -> (-b^{99, 12}_2 ∧  b^{99, 12}_1 ∧ -b^{99, 12}_0)
c  in CNF:
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_2
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨  b^{99, 12}_1
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ -p_1089 ∨ -b^{99, 12}_0
c  in DIMACS:
 19358  19359 -19360 -1089 -19361 0
 19358  19359 -19360 -1089  19362 0
 19358  19359 -19360 -1089 -19363 0

c  2+1 --> break 
c    (-b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 19358 -19359  19360 -1089 1162 0


c  2-1 --> 1
c    (-b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧ -p_1089) -> (-b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧  b^{99, 12}_0)
c  in CNF:
c     b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_2
c     b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_1
c     b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨  b^{99, 12}_0
c  in DIMACS:
 19358 -19359  19360  1089 -19361 0
 19358 -19359  19360  1089 -19362 0
 19358 -19359  19360  1089  19363 0

c  1-1 --> 0
c    (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0 ∧ -p_1089) -> (-b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧ -b^{99, 12}_0)
c  in CNF:
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_2
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_1
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_0
c  in DIMACS:
 19358  19359 -19360  1089 -19361 0
 19358  19359 -19360  1089 -19362 0
 19358  19359 -19360  1089 -19363 0

c  0-1 --> -1
c    (-b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧ -p_1089) -> ( b^{99, 12}_2 ∧ -b^{99, 12}_1 ∧  b^{99, 12}_0)
c  in CNF:
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨  b^{99, 12}_2
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_1
c     b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨  b^{99, 12}_0
c  in DIMACS:
 19358  19359  19360  1089  19361 0
 19358  19359  19360  1089 -19362 0
 19358  19359  19360  1089  19363 0

c  -1-1 --> -2
c    ( b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧  b^{99, 11}_0 ∧ -p_1089) -> ( b^{99, 12}_2 ∧  b^{99, 12}_1 ∧ -b^{99, 12}_0)
c  in CNF:
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨  b^{99, 12}_2
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨  b^{99, 12}_1
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨  p_1089 ∨ -b^{99, 12}_0
c  in DIMACS:
-19358  19359 -19360  1089  19361 0
-19358  19359 -19360  1089  19362 0
-19358  19359 -19360  1089 -19363 0

c  -2-1 --> break 
c    ( b^{99, 11}_2 ∧  b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨  b^{99, 11}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-19358 -19359  19360  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{99, 11}_2 ∧ -b^{99, 11}_1 ∧ -b^{99, 11}_0 ∧ true) 
c  in CNF:
c    -b^{99, 11}_2 ∨  b^{99, 11}_1 ∨  b^{99, 11}_0 ∨ false 
c  in DIMACS:
-19358  19359  19360  0

c  3 does not represent an automaton state.
c    -(-b^{99, 11}_2 ∧  b^{99, 11}_1 ∧  b^{99, 11}_0 ∧ true) 
c  in CNF:
c     b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ false 
c  in DIMACS:
 19358 -19359 -19360  0
c  -3 does not represent an automaton state.
c    -( b^{99, 11}_2 ∧  b^{99, 11}_1 ∧  b^{99, 11}_0 ∧ true) 
c  in CNF:
c    -b^{99, 11}_2 ∨ -b^{99, 11}_1 ∨ -b^{99, 11}_0 ∨ false 
c  in DIMACS:
-19358 -19359 -19360  0

c INIT for k = 100
c    -b^{100, 1}_2
c    -b^{100, 1}_1
c    -b^{100, 1}_0
c  in DIMACS:
-19364 0
-19365 0
-19366 0

c Transitions for k = 100
c i = 1
c  -2+1 --> -1
c    ( b^{100, 1}_2 ∧  b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧  p_100) -> ( b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0)
c  in CNF:
c    -b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨  b^{100, 2}_2
c    -b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_1
c    -b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨  b^{100, 2}_0
c  in DIMACS:
-19364 -19365  19366 -100  19367 0
-19364 -19365  19366 -100 -19368 0
-19364 -19365  19366 -100  19369 0

c  -1+1 --> 0
c    ( b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧  b^{100, 1}_0 ∧  p_100) -> (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧ -b^{100, 2}_0)
c  in CNF:
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_2
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_1
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_0
c  in DIMACS:
-19364  19365 -19366 -100 -19367 0
-19364  19365 -19366 -100 -19368 0
-19364  19365 -19366 -100 -19369 0

c  0+1 --> 1
c    (-b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧  p_100) -> (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0)
c  in CNF:
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_2
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_1
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨  b^{100, 2}_0
c  in DIMACS:
 19364  19365  19366 -100 -19367 0
 19364  19365  19366 -100 -19368 0
 19364  19365  19366 -100  19369 0

c  1+1 --> 2
c    (-b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧  b^{100, 1}_0 ∧  p_100) -> (-b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0)
c  in CNF:
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_2
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨  b^{100, 2}_1
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ -p_100 ∨ -b^{100, 2}_0
c  in DIMACS:
 19364  19365 -19366 -100 -19367 0
 19364  19365 -19366 -100  19368 0
 19364  19365 -19366 -100 -19369 0

c  2+1 --> break 
c    (-b^{100, 1}_2 ∧  b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧  p_100) -> break
c  in CNF:
c     b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ -p_100 ∨ break
c  in DIMACS:
 19364 -19365  19366 -100 1162 0


c  2-1 --> 1
c    (-b^{100, 1}_2 ∧  b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧ -p_100) -> (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0)
c  in CNF:
c     b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_2
c     b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_1
c     b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨  b^{100, 2}_0
c  in DIMACS:
 19364 -19365  19366  100 -19367 0
 19364 -19365  19366  100 -19368 0
 19364 -19365  19366  100  19369 0

c  1-1 --> 0
c    (-b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧  b^{100, 1}_0 ∧ -p_100) -> (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧ -b^{100, 2}_0)
c  in CNF:
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_2
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_1
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_0
c  in DIMACS:
 19364  19365 -19366  100 -19367 0
 19364  19365 -19366  100 -19368 0
 19364  19365 -19366  100 -19369 0

c  0-1 --> -1
c    (-b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧ -p_100) -> ( b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0)
c  in CNF:
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨  b^{100, 2}_2
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_1
c     b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨  b^{100, 2}_0
c  in DIMACS:
 19364  19365  19366  100  19367 0
 19364  19365  19366  100 -19368 0
 19364  19365  19366  100  19369 0

c  -1-1 --> -2
c    ( b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧  b^{100, 1}_0 ∧ -p_100) -> ( b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0)
c  in CNF:
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨  b^{100, 2}_2
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨  b^{100, 2}_1
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨  p_100 ∨ -b^{100, 2}_0
c  in DIMACS:
-19364  19365 -19366  100  19367 0
-19364  19365 -19366  100  19368 0
-19364  19365 -19366  100 -19369 0

c  -2-1 --> break 
c    ( b^{100, 1}_2 ∧  b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧ -p_100) -> break
c  in CNF:
c    -b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨  b^{100, 1}_0 ∨  p_100 ∨ break
c  in DIMACS:
-19364 -19365  19366  100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 1}_2 ∧ -b^{100, 1}_1 ∧ -b^{100, 1}_0 ∧ true) 
c  in CNF:
c    -b^{100, 1}_2 ∨  b^{100, 1}_1 ∨  b^{100, 1}_0 ∨ false 
c  in DIMACS:
-19364  19365  19366  0

c  3 does not represent an automaton state.
c    -(-b^{100, 1}_2 ∧  b^{100, 1}_1 ∧  b^{100, 1}_0 ∧ true) 
c  in CNF:
c     b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ false 
c  in DIMACS:
 19364 -19365 -19366  0
c  -3 does not represent an automaton state.
c    -( b^{100, 1}_2 ∧  b^{100, 1}_1 ∧  b^{100, 1}_0 ∧ true) 
c  in CNF:
c    -b^{100, 1}_2 ∨ -b^{100, 1}_1 ∨ -b^{100, 1}_0 ∨ false 
c  in DIMACS:
-19364 -19365 -19366  0

c i = 2
c  -2+1 --> -1
c    ( b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧  p_200) -> ( b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0)
c  in CNF:
c    -b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨  b^{100, 3}_2
c    -b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_1
c    -b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨  b^{100, 3}_0
c  in DIMACS:
-19367 -19368  19369 -200  19370 0
-19367 -19368  19369 -200 -19371 0
-19367 -19368  19369 -200  19372 0

c  -1+1 --> 0
c    ( b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0 ∧  p_200) -> (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧ -b^{100, 3}_0)
c  in CNF:
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_2
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_1
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_0
c  in DIMACS:
-19367  19368 -19369 -200 -19370 0
-19367  19368 -19369 -200 -19371 0
-19367  19368 -19369 -200 -19372 0

c  0+1 --> 1
c    (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧  p_200) -> (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0)
c  in CNF:
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_2
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_1
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨  b^{100, 3}_0
c  in DIMACS:
 19367  19368  19369 -200 -19370 0
 19367  19368  19369 -200 -19371 0
 19367  19368  19369 -200  19372 0

c  1+1 --> 2
c    (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0 ∧  p_200) -> (-b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0)
c  in CNF:
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_2
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨  b^{100, 3}_1
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ -p_200 ∨ -b^{100, 3}_0
c  in DIMACS:
 19367  19368 -19369 -200 -19370 0
 19367  19368 -19369 -200  19371 0
 19367  19368 -19369 -200 -19372 0

c  2+1 --> break 
c    (-b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧  p_200) -> break
c  in CNF:
c     b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 19367 -19368  19369 -200 1162 0


c  2-1 --> 1
c    (-b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧ -p_200) -> (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0)
c  in CNF:
c     b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_2
c     b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_1
c     b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨  b^{100, 3}_0
c  in DIMACS:
 19367 -19368  19369  200 -19370 0
 19367 -19368  19369  200 -19371 0
 19367 -19368  19369  200  19372 0

c  1-1 --> 0
c    (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0 ∧ -p_200) -> (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧ -b^{100, 3}_0)
c  in CNF:
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_2
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_1
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_0
c  in DIMACS:
 19367  19368 -19369  200 -19370 0
 19367  19368 -19369  200 -19371 0
 19367  19368 -19369  200 -19372 0

c  0-1 --> -1
c    (-b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧ -p_200) -> ( b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0)
c  in CNF:
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨  b^{100, 3}_2
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_1
c     b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨  b^{100, 3}_0
c  in DIMACS:
 19367  19368  19369  200  19370 0
 19367  19368  19369  200 -19371 0
 19367  19368  19369  200  19372 0

c  -1-1 --> -2
c    ( b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧  b^{100, 2}_0 ∧ -p_200) -> ( b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0)
c  in CNF:
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨  b^{100, 3}_2
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨  b^{100, 3}_1
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨  p_200 ∨ -b^{100, 3}_0
c  in DIMACS:
-19367  19368 -19369  200  19370 0
-19367  19368 -19369  200  19371 0
-19367  19368 -19369  200 -19372 0

c  -2-1 --> break 
c    ( b^{100, 2}_2 ∧  b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨  b^{100, 2}_0 ∨  p_200 ∨ break
c  in DIMACS:
-19367 -19368  19369  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 2}_2 ∧ -b^{100, 2}_1 ∧ -b^{100, 2}_0 ∧ true) 
c  in CNF:
c    -b^{100, 2}_2 ∨  b^{100, 2}_1 ∨  b^{100, 2}_0 ∨ false 
c  in DIMACS:
-19367  19368  19369  0

c  3 does not represent an automaton state.
c    -(-b^{100, 2}_2 ∧  b^{100, 2}_1 ∧  b^{100, 2}_0 ∧ true) 
c  in CNF:
c     b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ false 
c  in DIMACS:
 19367 -19368 -19369  0
c  -3 does not represent an automaton state.
c    -( b^{100, 2}_2 ∧  b^{100, 2}_1 ∧  b^{100, 2}_0 ∧ true) 
c  in CNF:
c    -b^{100, 2}_2 ∨ -b^{100, 2}_1 ∨ -b^{100, 2}_0 ∨ false 
c  in DIMACS:
-19367 -19368 -19369  0

c i = 3
c  -2+1 --> -1
c    ( b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧  p_300) -> ( b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0)
c  in CNF:
c    -b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨  b^{100, 4}_2
c    -b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_1
c    -b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨  b^{100, 4}_0
c  in DIMACS:
-19370 -19371  19372 -300  19373 0
-19370 -19371  19372 -300 -19374 0
-19370 -19371  19372 -300  19375 0

c  -1+1 --> 0
c    ( b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0 ∧  p_300) -> (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧ -b^{100, 4}_0)
c  in CNF:
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_2
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_1
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_0
c  in DIMACS:
-19370  19371 -19372 -300 -19373 0
-19370  19371 -19372 -300 -19374 0
-19370  19371 -19372 -300 -19375 0

c  0+1 --> 1
c    (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧  p_300) -> (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0)
c  in CNF:
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_2
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_1
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨  b^{100, 4}_0
c  in DIMACS:
 19370  19371  19372 -300 -19373 0
 19370  19371  19372 -300 -19374 0
 19370  19371  19372 -300  19375 0

c  1+1 --> 2
c    (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0 ∧  p_300) -> (-b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0)
c  in CNF:
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_2
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨  b^{100, 4}_1
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ -p_300 ∨ -b^{100, 4}_0
c  in DIMACS:
 19370  19371 -19372 -300 -19373 0
 19370  19371 -19372 -300  19374 0
 19370  19371 -19372 -300 -19375 0

c  2+1 --> break 
c    (-b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧  p_300) -> break
c  in CNF:
c     b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 19370 -19371  19372 -300 1162 0


c  2-1 --> 1
c    (-b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧ -p_300) -> (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0)
c  in CNF:
c     b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_2
c     b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_1
c     b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨  b^{100, 4}_0
c  in DIMACS:
 19370 -19371  19372  300 -19373 0
 19370 -19371  19372  300 -19374 0
 19370 -19371  19372  300  19375 0

c  1-1 --> 0
c    (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0 ∧ -p_300) -> (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧ -b^{100, 4}_0)
c  in CNF:
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_2
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_1
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_0
c  in DIMACS:
 19370  19371 -19372  300 -19373 0
 19370  19371 -19372  300 -19374 0
 19370  19371 -19372  300 -19375 0

c  0-1 --> -1
c    (-b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧ -p_300) -> ( b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0)
c  in CNF:
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨  b^{100, 4}_2
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_1
c     b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨  b^{100, 4}_0
c  in DIMACS:
 19370  19371  19372  300  19373 0
 19370  19371  19372  300 -19374 0
 19370  19371  19372  300  19375 0

c  -1-1 --> -2
c    ( b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧  b^{100, 3}_0 ∧ -p_300) -> ( b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0)
c  in CNF:
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨  b^{100, 4}_2
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨  b^{100, 4}_1
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨  p_300 ∨ -b^{100, 4}_0
c  in DIMACS:
-19370  19371 -19372  300  19373 0
-19370  19371 -19372  300  19374 0
-19370  19371 -19372  300 -19375 0

c  -2-1 --> break 
c    ( b^{100, 3}_2 ∧  b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨  b^{100, 3}_0 ∨  p_300 ∨ break
c  in DIMACS:
-19370 -19371  19372  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 3}_2 ∧ -b^{100, 3}_1 ∧ -b^{100, 3}_0 ∧ true) 
c  in CNF:
c    -b^{100, 3}_2 ∨  b^{100, 3}_1 ∨  b^{100, 3}_0 ∨ false 
c  in DIMACS:
-19370  19371  19372  0

c  3 does not represent an automaton state.
c    -(-b^{100, 3}_2 ∧  b^{100, 3}_1 ∧  b^{100, 3}_0 ∧ true) 
c  in CNF:
c     b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ false 
c  in DIMACS:
 19370 -19371 -19372  0
c  -3 does not represent an automaton state.
c    -( b^{100, 3}_2 ∧  b^{100, 3}_1 ∧  b^{100, 3}_0 ∧ true) 
c  in CNF:
c    -b^{100, 3}_2 ∨ -b^{100, 3}_1 ∨ -b^{100, 3}_0 ∨ false 
c  in DIMACS:
-19370 -19371 -19372  0

c i = 4
c  -2+1 --> -1
c    ( b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧  p_400) -> ( b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0)
c  in CNF:
c    -b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨  b^{100, 5}_2
c    -b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_1
c    -b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨  b^{100, 5}_0
c  in DIMACS:
-19373 -19374  19375 -400  19376 0
-19373 -19374  19375 -400 -19377 0
-19373 -19374  19375 -400  19378 0

c  -1+1 --> 0
c    ( b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0 ∧  p_400) -> (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧ -b^{100, 5}_0)
c  in CNF:
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_2
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_1
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_0
c  in DIMACS:
-19373  19374 -19375 -400 -19376 0
-19373  19374 -19375 -400 -19377 0
-19373  19374 -19375 -400 -19378 0

c  0+1 --> 1
c    (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧  p_400) -> (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0)
c  in CNF:
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_2
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_1
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨  b^{100, 5}_0
c  in DIMACS:
 19373  19374  19375 -400 -19376 0
 19373  19374  19375 -400 -19377 0
 19373  19374  19375 -400  19378 0

c  1+1 --> 2
c    (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0 ∧  p_400) -> (-b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0)
c  in CNF:
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_2
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨  b^{100, 5}_1
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ -p_400 ∨ -b^{100, 5}_0
c  in DIMACS:
 19373  19374 -19375 -400 -19376 0
 19373  19374 -19375 -400  19377 0
 19373  19374 -19375 -400 -19378 0

c  2+1 --> break 
c    (-b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧  p_400) -> break
c  in CNF:
c     b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 19373 -19374  19375 -400 1162 0


c  2-1 --> 1
c    (-b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧ -p_400) -> (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0)
c  in CNF:
c     b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_2
c     b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_1
c     b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨  b^{100, 5}_0
c  in DIMACS:
 19373 -19374  19375  400 -19376 0
 19373 -19374  19375  400 -19377 0
 19373 -19374  19375  400  19378 0

c  1-1 --> 0
c    (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0 ∧ -p_400) -> (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧ -b^{100, 5}_0)
c  in CNF:
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_2
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_1
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_0
c  in DIMACS:
 19373  19374 -19375  400 -19376 0
 19373  19374 -19375  400 -19377 0
 19373  19374 -19375  400 -19378 0

c  0-1 --> -1
c    (-b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧ -p_400) -> ( b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0)
c  in CNF:
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨  b^{100, 5}_2
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_1
c     b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨  b^{100, 5}_0
c  in DIMACS:
 19373  19374  19375  400  19376 0
 19373  19374  19375  400 -19377 0
 19373  19374  19375  400  19378 0

c  -1-1 --> -2
c    ( b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧  b^{100, 4}_0 ∧ -p_400) -> ( b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0)
c  in CNF:
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨  b^{100, 5}_2
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨  b^{100, 5}_1
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨  p_400 ∨ -b^{100, 5}_0
c  in DIMACS:
-19373  19374 -19375  400  19376 0
-19373  19374 -19375  400  19377 0
-19373  19374 -19375  400 -19378 0

c  -2-1 --> break 
c    ( b^{100, 4}_2 ∧  b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨  b^{100, 4}_0 ∨  p_400 ∨ break
c  in DIMACS:
-19373 -19374  19375  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 4}_2 ∧ -b^{100, 4}_1 ∧ -b^{100, 4}_0 ∧ true) 
c  in CNF:
c    -b^{100, 4}_2 ∨  b^{100, 4}_1 ∨  b^{100, 4}_0 ∨ false 
c  in DIMACS:
-19373  19374  19375  0

c  3 does not represent an automaton state.
c    -(-b^{100, 4}_2 ∧  b^{100, 4}_1 ∧  b^{100, 4}_0 ∧ true) 
c  in CNF:
c     b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ false 
c  in DIMACS:
 19373 -19374 -19375  0
c  -3 does not represent an automaton state.
c    -( b^{100, 4}_2 ∧  b^{100, 4}_1 ∧  b^{100, 4}_0 ∧ true) 
c  in CNF:
c    -b^{100, 4}_2 ∨ -b^{100, 4}_1 ∨ -b^{100, 4}_0 ∨ false 
c  in DIMACS:
-19373 -19374 -19375  0

c i = 5
c  -2+1 --> -1
c    ( b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧  p_500) -> ( b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0)
c  in CNF:
c    -b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨  b^{100, 6}_2
c    -b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_1
c    -b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨  b^{100, 6}_0
c  in DIMACS:
-19376 -19377  19378 -500  19379 0
-19376 -19377  19378 -500 -19380 0
-19376 -19377  19378 -500  19381 0

c  -1+1 --> 0
c    ( b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0 ∧  p_500) -> (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧ -b^{100, 6}_0)
c  in CNF:
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_2
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_1
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_0
c  in DIMACS:
-19376  19377 -19378 -500 -19379 0
-19376  19377 -19378 -500 -19380 0
-19376  19377 -19378 -500 -19381 0

c  0+1 --> 1
c    (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧  p_500) -> (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0)
c  in CNF:
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_2
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_1
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨  b^{100, 6}_0
c  in DIMACS:
 19376  19377  19378 -500 -19379 0
 19376  19377  19378 -500 -19380 0
 19376  19377  19378 -500  19381 0

c  1+1 --> 2
c    (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0 ∧  p_500) -> (-b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0)
c  in CNF:
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_2
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨  b^{100, 6}_1
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ -p_500 ∨ -b^{100, 6}_0
c  in DIMACS:
 19376  19377 -19378 -500 -19379 0
 19376  19377 -19378 -500  19380 0
 19376  19377 -19378 -500 -19381 0

c  2+1 --> break 
c    (-b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧  p_500) -> break
c  in CNF:
c     b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 19376 -19377  19378 -500 1162 0


c  2-1 --> 1
c    (-b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧ -p_500) -> (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0)
c  in CNF:
c     b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_2
c     b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_1
c     b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨  b^{100, 6}_0
c  in DIMACS:
 19376 -19377  19378  500 -19379 0
 19376 -19377  19378  500 -19380 0
 19376 -19377  19378  500  19381 0

c  1-1 --> 0
c    (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0 ∧ -p_500) -> (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧ -b^{100, 6}_0)
c  in CNF:
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_2
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_1
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_0
c  in DIMACS:
 19376  19377 -19378  500 -19379 0
 19376  19377 -19378  500 -19380 0
 19376  19377 -19378  500 -19381 0

c  0-1 --> -1
c    (-b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧ -p_500) -> ( b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0)
c  in CNF:
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨  b^{100, 6}_2
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_1
c     b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨  b^{100, 6}_0
c  in DIMACS:
 19376  19377  19378  500  19379 0
 19376  19377  19378  500 -19380 0
 19376  19377  19378  500  19381 0

c  -1-1 --> -2
c    ( b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧  b^{100, 5}_0 ∧ -p_500) -> ( b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0)
c  in CNF:
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨  b^{100, 6}_2
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨  b^{100, 6}_1
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨  p_500 ∨ -b^{100, 6}_0
c  in DIMACS:
-19376  19377 -19378  500  19379 0
-19376  19377 -19378  500  19380 0
-19376  19377 -19378  500 -19381 0

c  -2-1 --> break 
c    ( b^{100, 5}_2 ∧  b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨  b^{100, 5}_0 ∨  p_500 ∨ break
c  in DIMACS:
-19376 -19377  19378  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 5}_2 ∧ -b^{100, 5}_1 ∧ -b^{100, 5}_0 ∧ true) 
c  in CNF:
c    -b^{100, 5}_2 ∨  b^{100, 5}_1 ∨  b^{100, 5}_0 ∨ false 
c  in DIMACS:
-19376  19377  19378  0

c  3 does not represent an automaton state.
c    -(-b^{100, 5}_2 ∧  b^{100, 5}_1 ∧  b^{100, 5}_0 ∧ true) 
c  in CNF:
c     b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ false 
c  in DIMACS:
 19376 -19377 -19378  0
c  -3 does not represent an automaton state.
c    -( b^{100, 5}_2 ∧  b^{100, 5}_1 ∧  b^{100, 5}_0 ∧ true) 
c  in CNF:
c    -b^{100, 5}_2 ∨ -b^{100, 5}_1 ∨ -b^{100, 5}_0 ∨ false 
c  in DIMACS:
-19376 -19377 -19378  0

c i = 6
c  -2+1 --> -1
c    ( b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧  p_600) -> ( b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0)
c  in CNF:
c    -b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨  b^{100, 7}_2
c    -b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_1
c    -b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨  b^{100, 7}_0
c  in DIMACS:
-19379 -19380  19381 -600  19382 0
-19379 -19380  19381 -600 -19383 0
-19379 -19380  19381 -600  19384 0

c  -1+1 --> 0
c    ( b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0 ∧  p_600) -> (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧ -b^{100, 7}_0)
c  in CNF:
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_2
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_1
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_0
c  in DIMACS:
-19379  19380 -19381 -600 -19382 0
-19379  19380 -19381 -600 -19383 0
-19379  19380 -19381 -600 -19384 0

c  0+1 --> 1
c    (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧  p_600) -> (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0)
c  in CNF:
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_2
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_1
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨  b^{100, 7}_0
c  in DIMACS:
 19379  19380  19381 -600 -19382 0
 19379  19380  19381 -600 -19383 0
 19379  19380  19381 -600  19384 0

c  1+1 --> 2
c    (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0 ∧  p_600) -> (-b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0)
c  in CNF:
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_2
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨  b^{100, 7}_1
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ -p_600 ∨ -b^{100, 7}_0
c  in DIMACS:
 19379  19380 -19381 -600 -19382 0
 19379  19380 -19381 -600  19383 0
 19379  19380 -19381 -600 -19384 0

c  2+1 --> break 
c    (-b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧  p_600) -> break
c  in CNF:
c     b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 19379 -19380  19381 -600 1162 0


c  2-1 --> 1
c    (-b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧ -p_600) -> (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0)
c  in CNF:
c     b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_2
c     b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_1
c     b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨  b^{100, 7}_0
c  in DIMACS:
 19379 -19380  19381  600 -19382 0
 19379 -19380  19381  600 -19383 0
 19379 -19380  19381  600  19384 0

c  1-1 --> 0
c    (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0 ∧ -p_600) -> (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧ -b^{100, 7}_0)
c  in CNF:
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_2
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_1
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_0
c  in DIMACS:
 19379  19380 -19381  600 -19382 0
 19379  19380 -19381  600 -19383 0
 19379  19380 -19381  600 -19384 0

c  0-1 --> -1
c    (-b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧ -p_600) -> ( b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0)
c  in CNF:
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨  b^{100, 7}_2
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_1
c     b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨  b^{100, 7}_0
c  in DIMACS:
 19379  19380  19381  600  19382 0
 19379  19380  19381  600 -19383 0
 19379  19380  19381  600  19384 0

c  -1-1 --> -2
c    ( b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧  b^{100, 6}_0 ∧ -p_600) -> ( b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0)
c  in CNF:
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨  b^{100, 7}_2
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨  b^{100, 7}_1
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨  p_600 ∨ -b^{100, 7}_0
c  in DIMACS:
-19379  19380 -19381  600  19382 0
-19379  19380 -19381  600  19383 0
-19379  19380 -19381  600 -19384 0

c  -2-1 --> break 
c    ( b^{100, 6}_2 ∧  b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨  b^{100, 6}_0 ∨  p_600 ∨ break
c  in DIMACS:
-19379 -19380  19381  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 6}_2 ∧ -b^{100, 6}_1 ∧ -b^{100, 6}_0 ∧ true) 
c  in CNF:
c    -b^{100, 6}_2 ∨  b^{100, 6}_1 ∨  b^{100, 6}_0 ∨ false 
c  in DIMACS:
-19379  19380  19381  0

c  3 does not represent an automaton state.
c    -(-b^{100, 6}_2 ∧  b^{100, 6}_1 ∧  b^{100, 6}_0 ∧ true) 
c  in CNF:
c     b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ false 
c  in DIMACS:
 19379 -19380 -19381  0
c  -3 does not represent an automaton state.
c    -( b^{100, 6}_2 ∧  b^{100, 6}_1 ∧  b^{100, 6}_0 ∧ true) 
c  in CNF:
c    -b^{100, 6}_2 ∨ -b^{100, 6}_1 ∨ -b^{100, 6}_0 ∨ false 
c  in DIMACS:
-19379 -19380 -19381  0

c i = 7
c  -2+1 --> -1
c    ( b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧  p_700) -> ( b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0)
c  in CNF:
c    -b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨  b^{100, 8}_2
c    -b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_1
c    -b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨  b^{100, 8}_0
c  in DIMACS:
-19382 -19383  19384 -700  19385 0
-19382 -19383  19384 -700 -19386 0
-19382 -19383  19384 -700  19387 0

c  -1+1 --> 0
c    ( b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0 ∧  p_700) -> (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧ -b^{100, 8}_0)
c  in CNF:
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_2
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_1
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_0
c  in DIMACS:
-19382  19383 -19384 -700 -19385 0
-19382  19383 -19384 -700 -19386 0
-19382  19383 -19384 -700 -19387 0

c  0+1 --> 1
c    (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧  p_700) -> (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0)
c  in CNF:
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_2
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_1
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨  b^{100, 8}_0
c  in DIMACS:
 19382  19383  19384 -700 -19385 0
 19382  19383  19384 -700 -19386 0
 19382  19383  19384 -700  19387 0

c  1+1 --> 2
c    (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0 ∧  p_700) -> (-b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0)
c  in CNF:
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_2
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨  b^{100, 8}_1
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ -p_700 ∨ -b^{100, 8}_0
c  in DIMACS:
 19382  19383 -19384 -700 -19385 0
 19382  19383 -19384 -700  19386 0
 19382  19383 -19384 -700 -19387 0

c  2+1 --> break 
c    (-b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧  p_700) -> break
c  in CNF:
c     b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 19382 -19383  19384 -700 1162 0


c  2-1 --> 1
c    (-b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧ -p_700) -> (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0)
c  in CNF:
c     b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_2
c     b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_1
c     b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨  b^{100, 8}_0
c  in DIMACS:
 19382 -19383  19384  700 -19385 0
 19382 -19383  19384  700 -19386 0
 19382 -19383  19384  700  19387 0

c  1-1 --> 0
c    (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0 ∧ -p_700) -> (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧ -b^{100, 8}_0)
c  in CNF:
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_2
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_1
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_0
c  in DIMACS:
 19382  19383 -19384  700 -19385 0
 19382  19383 -19384  700 -19386 0
 19382  19383 -19384  700 -19387 0

c  0-1 --> -1
c    (-b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧ -p_700) -> ( b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0)
c  in CNF:
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨  b^{100, 8}_2
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_1
c     b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨  b^{100, 8}_0
c  in DIMACS:
 19382  19383  19384  700  19385 0
 19382  19383  19384  700 -19386 0
 19382  19383  19384  700  19387 0

c  -1-1 --> -2
c    ( b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧  b^{100, 7}_0 ∧ -p_700) -> ( b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0)
c  in CNF:
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨  b^{100, 8}_2
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨  b^{100, 8}_1
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨  p_700 ∨ -b^{100, 8}_0
c  in DIMACS:
-19382  19383 -19384  700  19385 0
-19382  19383 -19384  700  19386 0
-19382  19383 -19384  700 -19387 0

c  -2-1 --> break 
c    ( b^{100, 7}_2 ∧  b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨  b^{100, 7}_0 ∨  p_700 ∨ break
c  in DIMACS:
-19382 -19383  19384  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 7}_2 ∧ -b^{100, 7}_1 ∧ -b^{100, 7}_0 ∧ true) 
c  in CNF:
c    -b^{100, 7}_2 ∨  b^{100, 7}_1 ∨  b^{100, 7}_0 ∨ false 
c  in DIMACS:
-19382  19383  19384  0

c  3 does not represent an automaton state.
c    -(-b^{100, 7}_2 ∧  b^{100, 7}_1 ∧  b^{100, 7}_0 ∧ true) 
c  in CNF:
c     b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ false 
c  in DIMACS:
 19382 -19383 -19384  0
c  -3 does not represent an automaton state.
c    -( b^{100, 7}_2 ∧  b^{100, 7}_1 ∧  b^{100, 7}_0 ∧ true) 
c  in CNF:
c    -b^{100, 7}_2 ∨ -b^{100, 7}_1 ∨ -b^{100, 7}_0 ∨ false 
c  in DIMACS:
-19382 -19383 -19384  0

c i = 8
c  -2+1 --> -1
c    ( b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧  p_800) -> ( b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0)
c  in CNF:
c    -b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨  b^{100, 9}_2
c    -b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_1
c    -b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨  b^{100, 9}_0
c  in DIMACS:
-19385 -19386  19387 -800  19388 0
-19385 -19386  19387 -800 -19389 0
-19385 -19386  19387 -800  19390 0

c  -1+1 --> 0
c    ( b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0 ∧  p_800) -> (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧ -b^{100, 9}_0)
c  in CNF:
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_2
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_1
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_0
c  in DIMACS:
-19385  19386 -19387 -800 -19388 0
-19385  19386 -19387 -800 -19389 0
-19385  19386 -19387 -800 -19390 0

c  0+1 --> 1
c    (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧  p_800) -> (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0)
c  in CNF:
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_2
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_1
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨  b^{100, 9}_0
c  in DIMACS:
 19385  19386  19387 -800 -19388 0
 19385  19386  19387 -800 -19389 0
 19385  19386  19387 -800  19390 0

c  1+1 --> 2
c    (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0 ∧  p_800) -> (-b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0)
c  in CNF:
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_2
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨  b^{100, 9}_1
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ -p_800 ∨ -b^{100, 9}_0
c  in DIMACS:
 19385  19386 -19387 -800 -19388 0
 19385  19386 -19387 -800  19389 0
 19385  19386 -19387 -800 -19390 0

c  2+1 --> break 
c    (-b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧  p_800) -> break
c  in CNF:
c     b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 19385 -19386  19387 -800 1162 0


c  2-1 --> 1
c    (-b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧ -p_800) -> (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0)
c  in CNF:
c     b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_2
c     b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_1
c     b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨  b^{100, 9}_0
c  in DIMACS:
 19385 -19386  19387  800 -19388 0
 19385 -19386  19387  800 -19389 0
 19385 -19386  19387  800  19390 0

c  1-1 --> 0
c    (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0 ∧ -p_800) -> (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧ -b^{100, 9}_0)
c  in CNF:
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_2
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_1
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_0
c  in DIMACS:
 19385  19386 -19387  800 -19388 0
 19385  19386 -19387  800 -19389 0
 19385  19386 -19387  800 -19390 0

c  0-1 --> -1
c    (-b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧ -p_800) -> ( b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0)
c  in CNF:
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨  b^{100, 9}_2
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_1
c     b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨  b^{100, 9}_0
c  in DIMACS:
 19385  19386  19387  800  19388 0
 19385  19386  19387  800 -19389 0
 19385  19386  19387  800  19390 0

c  -1-1 --> -2
c    ( b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧  b^{100, 8}_0 ∧ -p_800) -> ( b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0)
c  in CNF:
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨  b^{100, 9}_2
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨  b^{100, 9}_1
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨  p_800 ∨ -b^{100, 9}_0
c  in DIMACS:
-19385  19386 -19387  800  19388 0
-19385  19386 -19387  800  19389 0
-19385  19386 -19387  800 -19390 0

c  -2-1 --> break 
c    ( b^{100, 8}_2 ∧  b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨  b^{100, 8}_0 ∨  p_800 ∨ break
c  in DIMACS:
-19385 -19386  19387  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 8}_2 ∧ -b^{100, 8}_1 ∧ -b^{100, 8}_0 ∧ true) 
c  in CNF:
c    -b^{100, 8}_2 ∨  b^{100, 8}_1 ∨  b^{100, 8}_0 ∨ false 
c  in DIMACS:
-19385  19386  19387  0

c  3 does not represent an automaton state.
c    -(-b^{100, 8}_2 ∧  b^{100, 8}_1 ∧  b^{100, 8}_0 ∧ true) 
c  in CNF:
c     b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ false 
c  in DIMACS:
 19385 -19386 -19387  0
c  -3 does not represent an automaton state.
c    -( b^{100, 8}_2 ∧  b^{100, 8}_1 ∧  b^{100, 8}_0 ∧ true) 
c  in CNF:
c    -b^{100, 8}_2 ∨ -b^{100, 8}_1 ∨ -b^{100, 8}_0 ∨ false 
c  in DIMACS:
-19385 -19386 -19387  0

c i = 9
c  -2+1 --> -1
c    ( b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧  p_900) -> ( b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0)
c  in CNF:
c    -b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨  b^{100, 10}_2
c    -b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_1
c    -b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨  b^{100, 10}_0
c  in DIMACS:
-19388 -19389  19390 -900  19391 0
-19388 -19389  19390 -900 -19392 0
-19388 -19389  19390 -900  19393 0

c  -1+1 --> 0
c    ( b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0 ∧  p_900) -> (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧ -b^{100, 10}_0)
c  in CNF:
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_2
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_1
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_0
c  in DIMACS:
-19388  19389 -19390 -900 -19391 0
-19388  19389 -19390 -900 -19392 0
-19388  19389 -19390 -900 -19393 0

c  0+1 --> 1
c    (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧  p_900) -> (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0)
c  in CNF:
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_2
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_1
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨  b^{100, 10}_0
c  in DIMACS:
 19388  19389  19390 -900 -19391 0
 19388  19389  19390 -900 -19392 0
 19388  19389  19390 -900  19393 0

c  1+1 --> 2
c    (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0 ∧  p_900) -> (-b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0)
c  in CNF:
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_2
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨  b^{100, 10}_1
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ -p_900 ∨ -b^{100, 10}_0
c  in DIMACS:
 19388  19389 -19390 -900 -19391 0
 19388  19389 -19390 -900  19392 0
 19388  19389 -19390 -900 -19393 0

c  2+1 --> break 
c    (-b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧  p_900) -> break
c  in CNF:
c     b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 19388 -19389  19390 -900 1162 0


c  2-1 --> 1
c    (-b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧ -p_900) -> (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0)
c  in CNF:
c     b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_2
c     b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_1
c     b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨  b^{100, 10}_0
c  in DIMACS:
 19388 -19389  19390  900 -19391 0
 19388 -19389  19390  900 -19392 0
 19388 -19389  19390  900  19393 0

c  1-1 --> 0
c    (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0 ∧ -p_900) -> (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧ -b^{100, 10}_0)
c  in CNF:
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_2
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_1
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_0
c  in DIMACS:
 19388  19389 -19390  900 -19391 0
 19388  19389 -19390  900 -19392 0
 19388  19389 -19390  900 -19393 0

c  0-1 --> -1
c    (-b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧ -p_900) -> ( b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0)
c  in CNF:
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨  b^{100, 10}_2
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_1
c     b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨  b^{100, 10}_0
c  in DIMACS:
 19388  19389  19390  900  19391 0
 19388  19389  19390  900 -19392 0
 19388  19389  19390  900  19393 0

c  -1-1 --> -2
c    ( b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧  b^{100, 9}_0 ∧ -p_900) -> ( b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0)
c  in CNF:
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨  b^{100, 10}_2
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨  b^{100, 10}_1
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨  p_900 ∨ -b^{100, 10}_0
c  in DIMACS:
-19388  19389 -19390  900  19391 0
-19388  19389 -19390  900  19392 0
-19388  19389 -19390  900 -19393 0

c  -2-1 --> break 
c    ( b^{100, 9}_2 ∧  b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨  b^{100, 9}_0 ∨  p_900 ∨ break
c  in DIMACS:
-19388 -19389  19390  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 9}_2 ∧ -b^{100, 9}_1 ∧ -b^{100, 9}_0 ∧ true) 
c  in CNF:
c    -b^{100, 9}_2 ∨  b^{100, 9}_1 ∨  b^{100, 9}_0 ∨ false 
c  in DIMACS:
-19388  19389  19390  0

c  3 does not represent an automaton state.
c    -(-b^{100, 9}_2 ∧  b^{100, 9}_1 ∧  b^{100, 9}_0 ∧ true) 
c  in CNF:
c     b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ false 
c  in DIMACS:
 19388 -19389 -19390  0
c  -3 does not represent an automaton state.
c    -( b^{100, 9}_2 ∧  b^{100, 9}_1 ∧  b^{100, 9}_0 ∧ true) 
c  in CNF:
c    -b^{100, 9}_2 ∨ -b^{100, 9}_1 ∨ -b^{100, 9}_0 ∨ false 
c  in DIMACS:
-19388 -19389 -19390  0

c i = 10
c  -2+1 --> -1
c    ( b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧  p_1000) -> ( b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0)
c  in CNF:
c    -b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨  b^{100, 11}_2
c    -b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_1
c    -b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨  b^{100, 11}_0
c  in DIMACS:
-19391 -19392  19393 -1000  19394 0
-19391 -19392  19393 -1000 -19395 0
-19391 -19392  19393 -1000  19396 0

c  -1+1 --> 0
c    ( b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0 ∧  p_1000) -> (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧ -b^{100, 11}_0)
c  in CNF:
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_2
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_1
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_0
c  in DIMACS:
-19391  19392 -19393 -1000 -19394 0
-19391  19392 -19393 -1000 -19395 0
-19391  19392 -19393 -1000 -19396 0

c  0+1 --> 1
c    (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧  p_1000) -> (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0)
c  in CNF:
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_2
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_1
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨  b^{100, 11}_0
c  in DIMACS:
 19391  19392  19393 -1000 -19394 0
 19391  19392  19393 -1000 -19395 0
 19391  19392  19393 -1000  19396 0

c  1+1 --> 2
c    (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0 ∧  p_1000) -> (-b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0)
c  in CNF:
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_2
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨  b^{100, 11}_1
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ -p_1000 ∨ -b^{100, 11}_0
c  in DIMACS:
 19391  19392 -19393 -1000 -19394 0
 19391  19392 -19393 -1000  19395 0
 19391  19392 -19393 -1000 -19396 0

c  2+1 --> break 
c    (-b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 19391 -19392  19393 -1000 1162 0


c  2-1 --> 1
c    (-b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧ -p_1000) -> (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0)
c  in CNF:
c     b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_2
c     b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_1
c     b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨  b^{100, 11}_0
c  in DIMACS:
 19391 -19392  19393  1000 -19394 0
 19391 -19392  19393  1000 -19395 0
 19391 -19392  19393  1000  19396 0

c  1-1 --> 0
c    (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0 ∧ -p_1000) -> (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧ -b^{100, 11}_0)
c  in CNF:
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_2
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_1
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_0
c  in DIMACS:
 19391  19392 -19393  1000 -19394 0
 19391  19392 -19393  1000 -19395 0
 19391  19392 -19393  1000 -19396 0

c  0-1 --> -1
c    (-b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧ -p_1000) -> ( b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0)
c  in CNF:
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨  b^{100, 11}_2
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_1
c     b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨  b^{100, 11}_0
c  in DIMACS:
 19391  19392  19393  1000  19394 0
 19391  19392  19393  1000 -19395 0
 19391  19392  19393  1000  19396 0

c  -1-1 --> -2
c    ( b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧  b^{100, 10}_0 ∧ -p_1000) -> ( b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0)
c  in CNF:
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨  b^{100, 11}_2
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨  b^{100, 11}_1
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨  p_1000 ∨ -b^{100, 11}_0
c  in DIMACS:
-19391  19392 -19393  1000  19394 0
-19391  19392 -19393  1000  19395 0
-19391  19392 -19393  1000 -19396 0

c  -2-1 --> break 
c    ( b^{100, 10}_2 ∧  b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨  b^{100, 10}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-19391 -19392  19393  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 10}_2 ∧ -b^{100, 10}_1 ∧ -b^{100, 10}_0 ∧ true) 
c  in CNF:
c    -b^{100, 10}_2 ∨  b^{100, 10}_1 ∨  b^{100, 10}_0 ∨ false 
c  in DIMACS:
-19391  19392  19393  0

c  3 does not represent an automaton state.
c    -(-b^{100, 10}_2 ∧  b^{100, 10}_1 ∧  b^{100, 10}_0 ∧ true) 
c  in CNF:
c     b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ false 
c  in DIMACS:
 19391 -19392 -19393  0
c  -3 does not represent an automaton state.
c    -( b^{100, 10}_2 ∧  b^{100, 10}_1 ∧  b^{100, 10}_0 ∧ true) 
c  in CNF:
c    -b^{100, 10}_2 ∨ -b^{100, 10}_1 ∨ -b^{100, 10}_0 ∨ false 
c  in DIMACS:
-19391 -19392 -19393  0

c i = 11
c  -2+1 --> -1
c    ( b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧  p_1100) -> ( b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧  b^{100, 12}_0)
c  in CNF:
c    -b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨  b^{100, 12}_2
c    -b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_1
c    -b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨  b^{100, 12}_0
c  in DIMACS:
-19394 -19395  19396 -1100  19397 0
-19394 -19395  19396 -1100 -19398 0
-19394 -19395  19396 -1100  19399 0

c  -1+1 --> 0
c    ( b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0 ∧  p_1100) -> (-b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧ -b^{100, 12}_0)
c  in CNF:
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_2
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_1
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_0
c  in DIMACS:
-19394  19395 -19396 -1100 -19397 0
-19394  19395 -19396 -1100 -19398 0
-19394  19395 -19396 -1100 -19399 0

c  0+1 --> 1
c    (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧  p_1100) -> (-b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧  b^{100, 12}_0)
c  in CNF:
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_2
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_1
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨  b^{100, 12}_0
c  in DIMACS:
 19394  19395  19396 -1100 -19397 0
 19394  19395  19396 -1100 -19398 0
 19394  19395  19396 -1100  19399 0

c  1+1 --> 2
c    (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0 ∧  p_1100) -> (-b^{100, 12}_2 ∧  b^{100, 12}_1 ∧ -b^{100, 12}_0)
c  in CNF:
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_2
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨  b^{100, 12}_1
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ -p_1100 ∨ -b^{100, 12}_0
c  in DIMACS:
 19394  19395 -19396 -1100 -19397 0
 19394  19395 -19396 -1100  19398 0
 19394  19395 -19396 -1100 -19399 0

c  2+1 --> break 
c    (-b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 19394 -19395  19396 -1100 1162 0


c  2-1 --> 1
c    (-b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧ -p_1100) -> (-b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧  b^{100, 12}_0)
c  in CNF:
c     b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_2
c     b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_1
c     b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨  b^{100, 12}_0
c  in DIMACS:
 19394 -19395  19396  1100 -19397 0
 19394 -19395  19396  1100 -19398 0
 19394 -19395  19396  1100  19399 0

c  1-1 --> 0
c    (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0 ∧ -p_1100) -> (-b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧ -b^{100, 12}_0)
c  in CNF:
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_2
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_1
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_0
c  in DIMACS:
 19394  19395 -19396  1100 -19397 0
 19394  19395 -19396  1100 -19398 0
 19394  19395 -19396  1100 -19399 0

c  0-1 --> -1
c    (-b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧ -p_1100) -> ( b^{100, 12}_2 ∧ -b^{100, 12}_1 ∧  b^{100, 12}_0)
c  in CNF:
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨  b^{100, 12}_2
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_1
c     b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨  b^{100, 12}_0
c  in DIMACS:
 19394  19395  19396  1100  19397 0
 19394  19395  19396  1100 -19398 0
 19394  19395  19396  1100  19399 0

c  -1-1 --> -2
c    ( b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧  b^{100, 11}_0 ∧ -p_1100) -> ( b^{100, 12}_2 ∧  b^{100, 12}_1 ∧ -b^{100, 12}_0)
c  in CNF:
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨  b^{100, 12}_2
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨  b^{100, 12}_1
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨  p_1100 ∨ -b^{100, 12}_0
c  in DIMACS:
-19394  19395 -19396  1100  19397 0
-19394  19395 -19396  1100  19398 0
-19394  19395 -19396  1100 -19399 0

c  -2-1 --> break 
c    ( b^{100, 11}_2 ∧  b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨  b^{100, 11}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-19394 -19395  19396  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{100, 11}_2 ∧ -b^{100, 11}_1 ∧ -b^{100, 11}_0 ∧ true) 
c  in CNF:
c    -b^{100, 11}_2 ∨  b^{100, 11}_1 ∨  b^{100, 11}_0 ∨ false 
c  in DIMACS:
-19394  19395  19396  0

c  3 does not represent an automaton state.
c    -(-b^{100, 11}_2 ∧  b^{100, 11}_1 ∧  b^{100, 11}_0 ∧ true) 
c  in CNF:
c     b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ false 
c  in DIMACS:
 19394 -19395 -19396  0
c  -3 does not represent an automaton state.
c    -( b^{100, 11}_2 ∧  b^{100, 11}_1 ∧  b^{100, 11}_0 ∧ true) 
c  in CNF:
c    -b^{100, 11}_2 ∨ -b^{100, 11}_1 ∨ -b^{100, 11}_0 ∨ false 
c  in DIMACS:
-19394 -19395 -19396  0

c INIT for k = 101
c    -b^{101, 1}_2
c    -b^{101, 1}_1
c    -b^{101, 1}_0
c  in DIMACS:
-19400 0
-19401 0
-19402 0

c Transitions for k = 101
c i = 1
c  -2+1 --> -1
c    ( b^{101, 1}_2 ∧  b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧  p_101) -> ( b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0)
c  in CNF:
c    -b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨  b^{101, 2}_2
c    -b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_1
c    -b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨  b^{101, 2}_0
c  in DIMACS:
-19400 -19401  19402 -101  19403 0
-19400 -19401  19402 -101 -19404 0
-19400 -19401  19402 -101  19405 0

c  -1+1 --> 0
c    ( b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧  b^{101, 1}_0 ∧  p_101) -> (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧ -b^{101, 2}_0)
c  in CNF:
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_2
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_1
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_0
c  in DIMACS:
-19400  19401 -19402 -101 -19403 0
-19400  19401 -19402 -101 -19404 0
-19400  19401 -19402 -101 -19405 0

c  0+1 --> 1
c    (-b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧  p_101) -> (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0)
c  in CNF:
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_2
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_1
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨  b^{101, 2}_0
c  in DIMACS:
 19400  19401  19402 -101 -19403 0
 19400  19401  19402 -101 -19404 0
 19400  19401  19402 -101  19405 0

c  1+1 --> 2
c    (-b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧  b^{101, 1}_0 ∧  p_101) -> (-b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0)
c  in CNF:
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_2
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨  b^{101, 2}_1
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ -p_101 ∨ -b^{101, 2}_0
c  in DIMACS:
 19400  19401 -19402 -101 -19403 0
 19400  19401 -19402 -101  19404 0
 19400  19401 -19402 -101 -19405 0

c  2+1 --> break 
c    (-b^{101, 1}_2 ∧  b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧  p_101) -> break
c  in CNF:
c     b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ -p_101 ∨ break
c  in DIMACS:
 19400 -19401  19402 -101 1162 0


c  2-1 --> 1
c    (-b^{101, 1}_2 ∧  b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧ -p_101) -> (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0)
c  in CNF:
c     b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_2
c     b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_1
c     b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨  b^{101, 2}_0
c  in DIMACS:
 19400 -19401  19402  101 -19403 0
 19400 -19401  19402  101 -19404 0
 19400 -19401  19402  101  19405 0

c  1-1 --> 0
c    (-b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧  b^{101, 1}_0 ∧ -p_101) -> (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧ -b^{101, 2}_0)
c  in CNF:
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_2
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_1
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_0
c  in DIMACS:
 19400  19401 -19402  101 -19403 0
 19400  19401 -19402  101 -19404 0
 19400  19401 -19402  101 -19405 0

c  0-1 --> -1
c    (-b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧ -p_101) -> ( b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0)
c  in CNF:
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨  b^{101, 2}_2
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_1
c     b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨  b^{101, 2}_0
c  in DIMACS:
 19400  19401  19402  101  19403 0
 19400  19401  19402  101 -19404 0
 19400  19401  19402  101  19405 0

c  -1-1 --> -2
c    ( b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧  b^{101, 1}_0 ∧ -p_101) -> ( b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0)
c  in CNF:
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨  b^{101, 2}_2
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨  b^{101, 2}_1
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨  p_101 ∨ -b^{101, 2}_0
c  in DIMACS:
-19400  19401 -19402  101  19403 0
-19400  19401 -19402  101  19404 0
-19400  19401 -19402  101 -19405 0

c  -2-1 --> break 
c    ( b^{101, 1}_2 ∧  b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧ -p_101) -> break
c  in CNF:
c    -b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨  b^{101, 1}_0 ∨  p_101 ∨ break
c  in DIMACS:
-19400 -19401  19402  101 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 1}_2 ∧ -b^{101, 1}_1 ∧ -b^{101, 1}_0 ∧ true) 
c  in CNF:
c    -b^{101, 1}_2 ∨  b^{101, 1}_1 ∨  b^{101, 1}_0 ∨ false 
c  in DIMACS:
-19400  19401  19402  0

c  3 does not represent an automaton state.
c    -(-b^{101, 1}_2 ∧  b^{101, 1}_1 ∧  b^{101, 1}_0 ∧ true) 
c  in CNF:
c     b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ false 
c  in DIMACS:
 19400 -19401 -19402  0
c  -3 does not represent an automaton state.
c    -( b^{101, 1}_2 ∧  b^{101, 1}_1 ∧  b^{101, 1}_0 ∧ true) 
c  in CNF:
c    -b^{101, 1}_2 ∨ -b^{101, 1}_1 ∨ -b^{101, 1}_0 ∨ false 
c  in DIMACS:
-19400 -19401 -19402  0

c i = 2
c  -2+1 --> -1
c    ( b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧  p_202) -> ( b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0)
c  in CNF:
c    -b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨  b^{101, 3}_2
c    -b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_1
c    -b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨  b^{101, 3}_0
c  in DIMACS:
-19403 -19404  19405 -202  19406 0
-19403 -19404  19405 -202 -19407 0
-19403 -19404  19405 -202  19408 0

c  -1+1 --> 0
c    ( b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0 ∧  p_202) -> (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧ -b^{101, 3}_0)
c  in CNF:
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_2
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_1
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_0
c  in DIMACS:
-19403  19404 -19405 -202 -19406 0
-19403  19404 -19405 -202 -19407 0
-19403  19404 -19405 -202 -19408 0

c  0+1 --> 1
c    (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧  p_202) -> (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0)
c  in CNF:
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_2
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_1
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨  b^{101, 3}_0
c  in DIMACS:
 19403  19404  19405 -202 -19406 0
 19403  19404  19405 -202 -19407 0
 19403  19404  19405 -202  19408 0

c  1+1 --> 2
c    (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0 ∧  p_202) -> (-b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0)
c  in CNF:
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_2
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨  b^{101, 3}_1
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ -p_202 ∨ -b^{101, 3}_0
c  in DIMACS:
 19403  19404 -19405 -202 -19406 0
 19403  19404 -19405 -202  19407 0
 19403  19404 -19405 -202 -19408 0

c  2+1 --> break 
c    (-b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧  p_202) -> break
c  in CNF:
c     b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ -p_202 ∨ break
c  in DIMACS:
 19403 -19404  19405 -202 1162 0


c  2-1 --> 1
c    (-b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧ -p_202) -> (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0)
c  in CNF:
c     b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_2
c     b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_1
c     b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨  b^{101, 3}_0
c  in DIMACS:
 19403 -19404  19405  202 -19406 0
 19403 -19404  19405  202 -19407 0
 19403 -19404  19405  202  19408 0

c  1-1 --> 0
c    (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0 ∧ -p_202) -> (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧ -b^{101, 3}_0)
c  in CNF:
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_2
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_1
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_0
c  in DIMACS:
 19403  19404 -19405  202 -19406 0
 19403  19404 -19405  202 -19407 0
 19403  19404 -19405  202 -19408 0

c  0-1 --> -1
c    (-b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧ -p_202) -> ( b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0)
c  in CNF:
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨  b^{101, 3}_2
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_1
c     b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨  b^{101, 3}_0
c  in DIMACS:
 19403  19404  19405  202  19406 0
 19403  19404  19405  202 -19407 0
 19403  19404  19405  202  19408 0

c  -1-1 --> -2
c    ( b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧  b^{101, 2}_0 ∧ -p_202) -> ( b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0)
c  in CNF:
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨  b^{101, 3}_2
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨  b^{101, 3}_1
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨  p_202 ∨ -b^{101, 3}_0
c  in DIMACS:
-19403  19404 -19405  202  19406 0
-19403  19404 -19405  202  19407 0
-19403  19404 -19405  202 -19408 0

c  -2-1 --> break 
c    ( b^{101, 2}_2 ∧  b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧ -p_202) -> break
c  in CNF:
c    -b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨  b^{101, 2}_0 ∨  p_202 ∨ break
c  in DIMACS:
-19403 -19404  19405  202 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 2}_2 ∧ -b^{101, 2}_1 ∧ -b^{101, 2}_0 ∧ true) 
c  in CNF:
c    -b^{101, 2}_2 ∨  b^{101, 2}_1 ∨  b^{101, 2}_0 ∨ false 
c  in DIMACS:
-19403  19404  19405  0

c  3 does not represent an automaton state.
c    -(-b^{101, 2}_2 ∧  b^{101, 2}_1 ∧  b^{101, 2}_0 ∧ true) 
c  in CNF:
c     b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ false 
c  in DIMACS:
 19403 -19404 -19405  0
c  -3 does not represent an automaton state.
c    -( b^{101, 2}_2 ∧  b^{101, 2}_1 ∧  b^{101, 2}_0 ∧ true) 
c  in CNF:
c    -b^{101, 2}_2 ∨ -b^{101, 2}_1 ∨ -b^{101, 2}_0 ∨ false 
c  in DIMACS:
-19403 -19404 -19405  0

c i = 3
c  -2+1 --> -1
c    ( b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧  p_303) -> ( b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0)
c  in CNF:
c    -b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨  b^{101, 4}_2
c    -b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_1
c    -b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨  b^{101, 4}_0
c  in DIMACS:
-19406 -19407  19408 -303  19409 0
-19406 -19407  19408 -303 -19410 0
-19406 -19407  19408 -303  19411 0

c  -1+1 --> 0
c    ( b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0 ∧  p_303) -> (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧ -b^{101, 4}_0)
c  in CNF:
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_2
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_1
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_0
c  in DIMACS:
-19406  19407 -19408 -303 -19409 0
-19406  19407 -19408 -303 -19410 0
-19406  19407 -19408 -303 -19411 0

c  0+1 --> 1
c    (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧  p_303) -> (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0)
c  in CNF:
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_2
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_1
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨  b^{101, 4}_0
c  in DIMACS:
 19406  19407  19408 -303 -19409 0
 19406  19407  19408 -303 -19410 0
 19406  19407  19408 -303  19411 0

c  1+1 --> 2
c    (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0 ∧  p_303) -> (-b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0)
c  in CNF:
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_2
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨  b^{101, 4}_1
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ -p_303 ∨ -b^{101, 4}_0
c  in DIMACS:
 19406  19407 -19408 -303 -19409 0
 19406  19407 -19408 -303  19410 0
 19406  19407 -19408 -303 -19411 0

c  2+1 --> break 
c    (-b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧  p_303) -> break
c  in CNF:
c     b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ -p_303 ∨ break
c  in DIMACS:
 19406 -19407  19408 -303 1162 0


c  2-1 --> 1
c    (-b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧ -p_303) -> (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0)
c  in CNF:
c     b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_2
c     b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_1
c     b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨  b^{101, 4}_0
c  in DIMACS:
 19406 -19407  19408  303 -19409 0
 19406 -19407  19408  303 -19410 0
 19406 -19407  19408  303  19411 0

c  1-1 --> 0
c    (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0 ∧ -p_303) -> (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧ -b^{101, 4}_0)
c  in CNF:
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_2
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_1
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_0
c  in DIMACS:
 19406  19407 -19408  303 -19409 0
 19406  19407 -19408  303 -19410 0
 19406  19407 -19408  303 -19411 0

c  0-1 --> -1
c    (-b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧ -p_303) -> ( b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0)
c  in CNF:
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨  b^{101, 4}_2
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_1
c     b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨  b^{101, 4}_0
c  in DIMACS:
 19406  19407  19408  303  19409 0
 19406  19407  19408  303 -19410 0
 19406  19407  19408  303  19411 0

c  -1-1 --> -2
c    ( b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧  b^{101, 3}_0 ∧ -p_303) -> ( b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0)
c  in CNF:
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨  b^{101, 4}_2
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨  b^{101, 4}_1
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨  p_303 ∨ -b^{101, 4}_0
c  in DIMACS:
-19406  19407 -19408  303  19409 0
-19406  19407 -19408  303  19410 0
-19406  19407 -19408  303 -19411 0

c  -2-1 --> break 
c    ( b^{101, 3}_2 ∧  b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧ -p_303) -> break
c  in CNF:
c    -b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨  b^{101, 3}_0 ∨  p_303 ∨ break
c  in DIMACS:
-19406 -19407  19408  303 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 3}_2 ∧ -b^{101, 3}_1 ∧ -b^{101, 3}_0 ∧ true) 
c  in CNF:
c    -b^{101, 3}_2 ∨  b^{101, 3}_1 ∨  b^{101, 3}_0 ∨ false 
c  in DIMACS:
-19406  19407  19408  0

c  3 does not represent an automaton state.
c    -(-b^{101, 3}_2 ∧  b^{101, 3}_1 ∧  b^{101, 3}_0 ∧ true) 
c  in CNF:
c     b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ false 
c  in DIMACS:
 19406 -19407 -19408  0
c  -3 does not represent an automaton state.
c    -( b^{101, 3}_2 ∧  b^{101, 3}_1 ∧  b^{101, 3}_0 ∧ true) 
c  in CNF:
c    -b^{101, 3}_2 ∨ -b^{101, 3}_1 ∨ -b^{101, 3}_0 ∨ false 
c  in DIMACS:
-19406 -19407 -19408  0

c i = 4
c  -2+1 --> -1
c    ( b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧  p_404) -> ( b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0)
c  in CNF:
c    -b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨  b^{101, 5}_2
c    -b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_1
c    -b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨  b^{101, 5}_0
c  in DIMACS:
-19409 -19410  19411 -404  19412 0
-19409 -19410  19411 -404 -19413 0
-19409 -19410  19411 -404  19414 0

c  -1+1 --> 0
c    ( b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0 ∧  p_404) -> (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧ -b^{101, 5}_0)
c  in CNF:
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_2
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_1
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_0
c  in DIMACS:
-19409  19410 -19411 -404 -19412 0
-19409  19410 -19411 -404 -19413 0
-19409  19410 -19411 -404 -19414 0

c  0+1 --> 1
c    (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧  p_404) -> (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0)
c  in CNF:
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_2
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_1
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨  b^{101, 5}_0
c  in DIMACS:
 19409  19410  19411 -404 -19412 0
 19409  19410  19411 -404 -19413 0
 19409  19410  19411 -404  19414 0

c  1+1 --> 2
c    (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0 ∧  p_404) -> (-b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0)
c  in CNF:
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_2
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨  b^{101, 5}_1
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ -p_404 ∨ -b^{101, 5}_0
c  in DIMACS:
 19409  19410 -19411 -404 -19412 0
 19409  19410 -19411 -404  19413 0
 19409  19410 -19411 -404 -19414 0

c  2+1 --> break 
c    (-b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧  p_404) -> break
c  in CNF:
c     b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ -p_404 ∨ break
c  in DIMACS:
 19409 -19410  19411 -404 1162 0


c  2-1 --> 1
c    (-b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧ -p_404) -> (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0)
c  in CNF:
c     b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_2
c     b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_1
c     b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨  b^{101, 5}_0
c  in DIMACS:
 19409 -19410  19411  404 -19412 0
 19409 -19410  19411  404 -19413 0
 19409 -19410  19411  404  19414 0

c  1-1 --> 0
c    (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0 ∧ -p_404) -> (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧ -b^{101, 5}_0)
c  in CNF:
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_2
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_1
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_0
c  in DIMACS:
 19409  19410 -19411  404 -19412 0
 19409  19410 -19411  404 -19413 0
 19409  19410 -19411  404 -19414 0

c  0-1 --> -1
c    (-b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧ -p_404) -> ( b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0)
c  in CNF:
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨  b^{101, 5}_2
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_1
c     b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨  b^{101, 5}_0
c  in DIMACS:
 19409  19410  19411  404  19412 0
 19409  19410  19411  404 -19413 0
 19409  19410  19411  404  19414 0

c  -1-1 --> -2
c    ( b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧  b^{101, 4}_0 ∧ -p_404) -> ( b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0)
c  in CNF:
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨  b^{101, 5}_2
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨  b^{101, 5}_1
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨  p_404 ∨ -b^{101, 5}_0
c  in DIMACS:
-19409  19410 -19411  404  19412 0
-19409  19410 -19411  404  19413 0
-19409  19410 -19411  404 -19414 0

c  -2-1 --> break 
c    ( b^{101, 4}_2 ∧  b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧ -p_404) -> break
c  in CNF:
c    -b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨  b^{101, 4}_0 ∨  p_404 ∨ break
c  in DIMACS:
-19409 -19410  19411  404 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 4}_2 ∧ -b^{101, 4}_1 ∧ -b^{101, 4}_0 ∧ true) 
c  in CNF:
c    -b^{101, 4}_2 ∨  b^{101, 4}_1 ∨  b^{101, 4}_0 ∨ false 
c  in DIMACS:
-19409  19410  19411  0

c  3 does not represent an automaton state.
c    -(-b^{101, 4}_2 ∧  b^{101, 4}_1 ∧  b^{101, 4}_0 ∧ true) 
c  in CNF:
c     b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ false 
c  in DIMACS:
 19409 -19410 -19411  0
c  -3 does not represent an automaton state.
c    -( b^{101, 4}_2 ∧  b^{101, 4}_1 ∧  b^{101, 4}_0 ∧ true) 
c  in CNF:
c    -b^{101, 4}_2 ∨ -b^{101, 4}_1 ∨ -b^{101, 4}_0 ∨ false 
c  in DIMACS:
-19409 -19410 -19411  0

c i = 5
c  -2+1 --> -1
c    ( b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧  p_505) -> ( b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0)
c  in CNF:
c    -b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨  b^{101, 6}_2
c    -b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_1
c    -b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨  b^{101, 6}_0
c  in DIMACS:
-19412 -19413  19414 -505  19415 0
-19412 -19413  19414 -505 -19416 0
-19412 -19413  19414 -505  19417 0

c  -1+1 --> 0
c    ( b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0 ∧  p_505) -> (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧ -b^{101, 6}_0)
c  in CNF:
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_2
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_1
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_0
c  in DIMACS:
-19412  19413 -19414 -505 -19415 0
-19412  19413 -19414 -505 -19416 0
-19412  19413 -19414 -505 -19417 0

c  0+1 --> 1
c    (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧  p_505) -> (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0)
c  in CNF:
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_2
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_1
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨  b^{101, 6}_0
c  in DIMACS:
 19412  19413  19414 -505 -19415 0
 19412  19413  19414 -505 -19416 0
 19412  19413  19414 -505  19417 0

c  1+1 --> 2
c    (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0 ∧  p_505) -> (-b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0)
c  in CNF:
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_2
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨  b^{101, 6}_1
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ -p_505 ∨ -b^{101, 6}_0
c  in DIMACS:
 19412  19413 -19414 -505 -19415 0
 19412  19413 -19414 -505  19416 0
 19412  19413 -19414 -505 -19417 0

c  2+1 --> break 
c    (-b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧  p_505) -> break
c  in CNF:
c     b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ -p_505 ∨ break
c  in DIMACS:
 19412 -19413  19414 -505 1162 0


c  2-1 --> 1
c    (-b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧ -p_505) -> (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0)
c  in CNF:
c     b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_2
c     b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_1
c     b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨  b^{101, 6}_0
c  in DIMACS:
 19412 -19413  19414  505 -19415 0
 19412 -19413  19414  505 -19416 0
 19412 -19413  19414  505  19417 0

c  1-1 --> 0
c    (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0 ∧ -p_505) -> (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧ -b^{101, 6}_0)
c  in CNF:
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_2
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_1
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_0
c  in DIMACS:
 19412  19413 -19414  505 -19415 0
 19412  19413 -19414  505 -19416 0
 19412  19413 -19414  505 -19417 0

c  0-1 --> -1
c    (-b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧ -p_505) -> ( b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0)
c  in CNF:
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨  b^{101, 6}_2
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_1
c     b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨  b^{101, 6}_0
c  in DIMACS:
 19412  19413  19414  505  19415 0
 19412  19413  19414  505 -19416 0
 19412  19413  19414  505  19417 0

c  -1-1 --> -2
c    ( b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧  b^{101, 5}_0 ∧ -p_505) -> ( b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0)
c  in CNF:
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨  b^{101, 6}_2
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨  b^{101, 6}_1
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨  p_505 ∨ -b^{101, 6}_0
c  in DIMACS:
-19412  19413 -19414  505  19415 0
-19412  19413 -19414  505  19416 0
-19412  19413 -19414  505 -19417 0

c  -2-1 --> break 
c    ( b^{101, 5}_2 ∧  b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧ -p_505) -> break
c  in CNF:
c    -b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨  b^{101, 5}_0 ∨  p_505 ∨ break
c  in DIMACS:
-19412 -19413  19414  505 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 5}_2 ∧ -b^{101, 5}_1 ∧ -b^{101, 5}_0 ∧ true) 
c  in CNF:
c    -b^{101, 5}_2 ∨  b^{101, 5}_1 ∨  b^{101, 5}_0 ∨ false 
c  in DIMACS:
-19412  19413  19414  0

c  3 does not represent an automaton state.
c    -(-b^{101, 5}_2 ∧  b^{101, 5}_1 ∧  b^{101, 5}_0 ∧ true) 
c  in CNF:
c     b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ false 
c  in DIMACS:
 19412 -19413 -19414  0
c  -3 does not represent an automaton state.
c    -( b^{101, 5}_2 ∧  b^{101, 5}_1 ∧  b^{101, 5}_0 ∧ true) 
c  in CNF:
c    -b^{101, 5}_2 ∨ -b^{101, 5}_1 ∨ -b^{101, 5}_0 ∨ false 
c  in DIMACS:
-19412 -19413 -19414  0

c i = 6
c  -2+1 --> -1
c    ( b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧  p_606) -> ( b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0)
c  in CNF:
c    -b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨  b^{101, 7}_2
c    -b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_1
c    -b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨  b^{101, 7}_0
c  in DIMACS:
-19415 -19416  19417 -606  19418 0
-19415 -19416  19417 -606 -19419 0
-19415 -19416  19417 -606  19420 0

c  -1+1 --> 0
c    ( b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0 ∧  p_606) -> (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧ -b^{101, 7}_0)
c  in CNF:
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_2
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_1
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_0
c  in DIMACS:
-19415  19416 -19417 -606 -19418 0
-19415  19416 -19417 -606 -19419 0
-19415  19416 -19417 -606 -19420 0

c  0+1 --> 1
c    (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧  p_606) -> (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0)
c  in CNF:
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_2
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_1
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨  b^{101, 7}_0
c  in DIMACS:
 19415  19416  19417 -606 -19418 0
 19415  19416  19417 -606 -19419 0
 19415  19416  19417 -606  19420 0

c  1+1 --> 2
c    (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0 ∧  p_606) -> (-b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0)
c  in CNF:
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_2
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨  b^{101, 7}_1
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ -p_606 ∨ -b^{101, 7}_0
c  in DIMACS:
 19415  19416 -19417 -606 -19418 0
 19415  19416 -19417 -606  19419 0
 19415  19416 -19417 -606 -19420 0

c  2+1 --> break 
c    (-b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧  p_606) -> break
c  in CNF:
c     b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 19415 -19416  19417 -606 1162 0


c  2-1 --> 1
c    (-b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧ -p_606) -> (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0)
c  in CNF:
c     b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_2
c     b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_1
c     b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨  b^{101, 7}_0
c  in DIMACS:
 19415 -19416  19417  606 -19418 0
 19415 -19416  19417  606 -19419 0
 19415 -19416  19417  606  19420 0

c  1-1 --> 0
c    (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0 ∧ -p_606) -> (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧ -b^{101, 7}_0)
c  in CNF:
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_2
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_1
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_0
c  in DIMACS:
 19415  19416 -19417  606 -19418 0
 19415  19416 -19417  606 -19419 0
 19415  19416 -19417  606 -19420 0

c  0-1 --> -1
c    (-b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧ -p_606) -> ( b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0)
c  in CNF:
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨  b^{101, 7}_2
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_1
c     b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨  b^{101, 7}_0
c  in DIMACS:
 19415  19416  19417  606  19418 0
 19415  19416  19417  606 -19419 0
 19415  19416  19417  606  19420 0

c  -1-1 --> -2
c    ( b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧  b^{101, 6}_0 ∧ -p_606) -> ( b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0)
c  in CNF:
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨  b^{101, 7}_2
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨  b^{101, 7}_1
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨  p_606 ∨ -b^{101, 7}_0
c  in DIMACS:
-19415  19416 -19417  606  19418 0
-19415  19416 -19417  606  19419 0
-19415  19416 -19417  606 -19420 0

c  -2-1 --> break 
c    ( b^{101, 6}_2 ∧  b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨  b^{101, 6}_0 ∨  p_606 ∨ break
c  in DIMACS:
-19415 -19416  19417  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 6}_2 ∧ -b^{101, 6}_1 ∧ -b^{101, 6}_0 ∧ true) 
c  in CNF:
c    -b^{101, 6}_2 ∨  b^{101, 6}_1 ∨  b^{101, 6}_0 ∨ false 
c  in DIMACS:
-19415  19416  19417  0

c  3 does not represent an automaton state.
c    -(-b^{101, 6}_2 ∧  b^{101, 6}_1 ∧  b^{101, 6}_0 ∧ true) 
c  in CNF:
c     b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ false 
c  in DIMACS:
 19415 -19416 -19417  0
c  -3 does not represent an automaton state.
c    -( b^{101, 6}_2 ∧  b^{101, 6}_1 ∧  b^{101, 6}_0 ∧ true) 
c  in CNF:
c    -b^{101, 6}_2 ∨ -b^{101, 6}_1 ∨ -b^{101, 6}_0 ∨ false 
c  in DIMACS:
-19415 -19416 -19417  0

c i = 7
c  -2+1 --> -1
c    ( b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧  p_707) -> ( b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0)
c  in CNF:
c    -b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨  b^{101, 8}_2
c    -b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_1
c    -b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨  b^{101, 8}_0
c  in DIMACS:
-19418 -19419  19420 -707  19421 0
-19418 -19419  19420 -707 -19422 0
-19418 -19419  19420 -707  19423 0

c  -1+1 --> 0
c    ( b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0 ∧  p_707) -> (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧ -b^{101, 8}_0)
c  in CNF:
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_2
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_1
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_0
c  in DIMACS:
-19418  19419 -19420 -707 -19421 0
-19418  19419 -19420 -707 -19422 0
-19418  19419 -19420 -707 -19423 0

c  0+1 --> 1
c    (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧  p_707) -> (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0)
c  in CNF:
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_2
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_1
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨  b^{101, 8}_0
c  in DIMACS:
 19418  19419  19420 -707 -19421 0
 19418  19419  19420 -707 -19422 0
 19418  19419  19420 -707  19423 0

c  1+1 --> 2
c    (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0 ∧  p_707) -> (-b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0)
c  in CNF:
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_2
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨  b^{101, 8}_1
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ -p_707 ∨ -b^{101, 8}_0
c  in DIMACS:
 19418  19419 -19420 -707 -19421 0
 19418  19419 -19420 -707  19422 0
 19418  19419 -19420 -707 -19423 0

c  2+1 --> break 
c    (-b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧  p_707) -> break
c  in CNF:
c     b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ -p_707 ∨ break
c  in DIMACS:
 19418 -19419  19420 -707 1162 0


c  2-1 --> 1
c    (-b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧ -p_707) -> (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0)
c  in CNF:
c     b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_2
c     b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_1
c     b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨  b^{101, 8}_0
c  in DIMACS:
 19418 -19419  19420  707 -19421 0
 19418 -19419  19420  707 -19422 0
 19418 -19419  19420  707  19423 0

c  1-1 --> 0
c    (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0 ∧ -p_707) -> (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧ -b^{101, 8}_0)
c  in CNF:
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_2
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_1
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_0
c  in DIMACS:
 19418  19419 -19420  707 -19421 0
 19418  19419 -19420  707 -19422 0
 19418  19419 -19420  707 -19423 0

c  0-1 --> -1
c    (-b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧ -p_707) -> ( b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0)
c  in CNF:
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨  b^{101, 8}_2
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_1
c     b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨  b^{101, 8}_0
c  in DIMACS:
 19418  19419  19420  707  19421 0
 19418  19419  19420  707 -19422 0
 19418  19419  19420  707  19423 0

c  -1-1 --> -2
c    ( b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧  b^{101, 7}_0 ∧ -p_707) -> ( b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0)
c  in CNF:
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨  b^{101, 8}_2
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨  b^{101, 8}_1
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨  p_707 ∨ -b^{101, 8}_0
c  in DIMACS:
-19418  19419 -19420  707  19421 0
-19418  19419 -19420  707  19422 0
-19418  19419 -19420  707 -19423 0

c  -2-1 --> break 
c    ( b^{101, 7}_2 ∧  b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧ -p_707) -> break
c  in CNF:
c    -b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨  b^{101, 7}_0 ∨  p_707 ∨ break
c  in DIMACS:
-19418 -19419  19420  707 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 7}_2 ∧ -b^{101, 7}_1 ∧ -b^{101, 7}_0 ∧ true) 
c  in CNF:
c    -b^{101, 7}_2 ∨  b^{101, 7}_1 ∨  b^{101, 7}_0 ∨ false 
c  in DIMACS:
-19418  19419  19420  0

c  3 does not represent an automaton state.
c    -(-b^{101, 7}_2 ∧  b^{101, 7}_1 ∧  b^{101, 7}_0 ∧ true) 
c  in CNF:
c     b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ false 
c  in DIMACS:
 19418 -19419 -19420  0
c  -3 does not represent an automaton state.
c    -( b^{101, 7}_2 ∧  b^{101, 7}_1 ∧  b^{101, 7}_0 ∧ true) 
c  in CNF:
c    -b^{101, 7}_2 ∨ -b^{101, 7}_1 ∨ -b^{101, 7}_0 ∨ false 
c  in DIMACS:
-19418 -19419 -19420  0

c i = 8
c  -2+1 --> -1
c    ( b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧  p_808) -> ( b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0)
c  in CNF:
c    -b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨  b^{101, 9}_2
c    -b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_1
c    -b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨  b^{101, 9}_0
c  in DIMACS:
-19421 -19422  19423 -808  19424 0
-19421 -19422  19423 -808 -19425 0
-19421 -19422  19423 -808  19426 0

c  -1+1 --> 0
c    ( b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0 ∧  p_808) -> (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧ -b^{101, 9}_0)
c  in CNF:
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_2
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_1
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_0
c  in DIMACS:
-19421  19422 -19423 -808 -19424 0
-19421  19422 -19423 -808 -19425 0
-19421  19422 -19423 -808 -19426 0

c  0+1 --> 1
c    (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧  p_808) -> (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0)
c  in CNF:
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_2
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_1
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨  b^{101, 9}_0
c  in DIMACS:
 19421  19422  19423 -808 -19424 0
 19421  19422  19423 -808 -19425 0
 19421  19422  19423 -808  19426 0

c  1+1 --> 2
c    (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0 ∧  p_808) -> (-b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0)
c  in CNF:
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_2
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨  b^{101, 9}_1
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ -p_808 ∨ -b^{101, 9}_0
c  in DIMACS:
 19421  19422 -19423 -808 -19424 0
 19421  19422 -19423 -808  19425 0
 19421  19422 -19423 -808 -19426 0

c  2+1 --> break 
c    (-b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧  p_808) -> break
c  in CNF:
c     b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 19421 -19422  19423 -808 1162 0


c  2-1 --> 1
c    (-b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧ -p_808) -> (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0)
c  in CNF:
c     b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_2
c     b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_1
c     b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨  b^{101, 9}_0
c  in DIMACS:
 19421 -19422  19423  808 -19424 0
 19421 -19422  19423  808 -19425 0
 19421 -19422  19423  808  19426 0

c  1-1 --> 0
c    (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0 ∧ -p_808) -> (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧ -b^{101, 9}_0)
c  in CNF:
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_2
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_1
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_0
c  in DIMACS:
 19421  19422 -19423  808 -19424 0
 19421  19422 -19423  808 -19425 0
 19421  19422 -19423  808 -19426 0

c  0-1 --> -1
c    (-b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧ -p_808) -> ( b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0)
c  in CNF:
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨  b^{101, 9}_2
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_1
c     b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨  b^{101, 9}_0
c  in DIMACS:
 19421  19422  19423  808  19424 0
 19421  19422  19423  808 -19425 0
 19421  19422  19423  808  19426 0

c  -1-1 --> -2
c    ( b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧  b^{101, 8}_0 ∧ -p_808) -> ( b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0)
c  in CNF:
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨  b^{101, 9}_2
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨  b^{101, 9}_1
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨  p_808 ∨ -b^{101, 9}_0
c  in DIMACS:
-19421  19422 -19423  808  19424 0
-19421  19422 -19423  808  19425 0
-19421  19422 -19423  808 -19426 0

c  -2-1 --> break 
c    ( b^{101, 8}_2 ∧  b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨  b^{101, 8}_0 ∨  p_808 ∨ break
c  in DIMACS:
-19421 -19422  19423  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 8}_2 ∧ -b^{101, 8}_1 ∧ -b^{101, 8}_0 ∧ true) 
c  in CNF:
c    -b^{101, 8}_2 ∨  b^{101, 8}_1 ∨  b^{101, 8}_0 ∨ false 
c  in DIMACS:
-19421  19422  19423  0

c  3 does not represent an automaton state.
c    -(-b^{101, 8}_2 ∧  b^{101, 8}_1 ∧  b^{101, 8}_0 ∧ true) 
c  in CNF:
c     b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ false 
c  in DIMACS:
 19421 -19422 -19423  0
c  -3 does not represent an automaton state.
c    -( b^{101, 8}_2 ∧  b^{101, 8}_1 ∧  b^{101, 8}_0 ∧ true) 
c  in CNF:
c    -b^{101, 8}_2 ∨ -b^{101, 8}_1 ∨ -b^{101, 8}_0 ∨ false 
c  in DIMACS:
-19421 -19422 -19423  0

c i = 9
c  -2+1 --> -1
c    ( b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧  p_909) -> ( b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0)
c  in CNF:
c    -b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨  b^{101, 10}_2
c    -b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_1
c    -b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨  b^{101, 10}_0
c  in DIMACS:
-19424 -19425  19426 -909  19427 0
-19424 -19425  19426 -909 -19428 0
-19424 -19425  19426 -909  19429 0

c  -1+1 --> 0
c    ( b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0 ∧  p_909) -> (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧ -b^{101, 10}_0)
c  in CNF:
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_2
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_1
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_0
c  in DIMACS:
-19424  19425 -19426 -909 -19427 0
-19424  19425 -19426 -909 -19428 0
-19424  19425 -19426 -909 -19429 0

c  0+1 --> 1
c    (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧  p_909) -> (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0)
c  in CNF:
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_2
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_1
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨  b^{101, 10}_0
c  in DIMACS:
 19424  19425  19426 -909 -19427 0
 19424  19425  19426 -909 -19428 0
 19424  19425  19426 -909  19429 0

c  1+1 --> 2
c    (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0 ∧  p_909) -> (-b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0)
c  in CNF:
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_2
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨  b^{101, 10}_1
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ -p_909 ∨ -b^{101, 10}_0
c  in DIMACS:
 19424  19425 -19426 -909 -19427 0
 19424  19425 -19426 -909  19428 0
 19424  19425 -19426 -909 -19429 0

c  2+1 --> break 
c    (-b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧  p_909) -> break
c  in CNF:
c     b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ -p_909 ∨ break
c  in DIMACS:
 19424 -19425  19426 -909 1162 0


c  2-1 --> 1
c    (-b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧ -p_909) -> (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0)
c  in CNF:
c     b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_2
c     b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_1
c     b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨  b^{101, 10}_0
c  in DIMACS:
 19424 -19425  19426  909 -19427 0
 19424 -19425  19426  909 -19428 0
 19424 -19425  19426  909  19429 0

c  1-1 --> 0
c    (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0 ∧ -p_909) -> (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧ -b^{101, 10}_0)
c  in CNF:
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_2
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_1
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_0
c  in DIMACS:
 19424  19425 -19426  909 -19427 0
 19424  19425 -19426  909 -19428 0
 19424  19425 -19426  909 -19429 0

c  0-1 --> -1
c    (-b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧ -p_909) -> ( b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0)
c  in CNF:
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨  b^{101, 10}_2
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_1
c     b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨  b^{101, 10}_0
c  in DIMACS:
 19424  19425  19426  909  19427 0
 19424  19425  19426  909 -19428 0
 19424  19425  19426  909  19429 0

c  -1-1 --> -2
c    ( b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧  b^{101, 9}_0 ∧ -p_909) -> ( b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0)
c  in CNF:
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨  b^{101, 10}_2
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨  b^{101, 10}_1
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨  p_909 ∨ -b^{101, 10}_0
c  in DIMACS:
-19424  19425 -19426  909  19427 0
-19424  19425 -19426  909  19428 0
-19424  19425 -19426  909 -19429 0

c  -2-1 --> break 
c    ( b^{101, 9}_2 ∧  b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧ -p_909) -> break
c  in CNF:
c    -b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨  b^{101, 9}_0 ∨  p_909 ∨ break
c  in DIMACS:
-19424 -19425  19426  909 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 9}_2 ∧ -b^{101, 9}_1 ∧ -b^{101, 9}_0 ∧ true) 
c  in CNF:
c    -b^{101, 9}_2 ∨  b^{101, 9}_1 ∨  b^{101, 9}_0 ∨ false 
c  in DIMACS:
-19424  19425  19426  0

c  3 does not represent an automaton state.
c    -(-b^{101, 9}_2 ∧  b^{101, 9}_1 ∧  b^{101, 9}_0 ∧ true) 
c  in CNF:
c     b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ false 
c  in DIMACS:
 19424 -19425 -19426  0
c  -3 does not represent an automaton state.
c    -( b^{101, 9}_2 ∧  b^{101, 9}_1 ∧  b^{101, 9}_0 ∧ true) 
c  in CNF:
c    -b^{101, 9}_2 ∨ -b^{101, 9}_1 ∨ -b^{101, 9}_0 ∨ false 
c  in DIMACS:
-19424 -19425 -19426  0

c i = 10
c  -2+1 --> -1
c    ( b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧  p_1010) -> ( b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0)
c  in CNF:
c    -b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨  b^{101, 11}_2
c    -b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_1
c    -b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨  b^{101, 11}_0
c  in DIMACS:
-19427 -19428  19429 -1010  19430 0
-19427 -19428  19429 -1010 -19431 0
-19427 -19428  19429 -1010  19432 0

c  -1+1 --> 0
c    ( b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0 ∧  p_1010) -> (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧ -b^{101, 11}_0)
c  in CNF:
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_2
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_1
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_0
c  in DIMACS:
-19427  19428 -19429 -1010 -19430 0
-19427  19428 -19429 -1010 -19431 0
-19427  19428 -19429 -1010 -19432 0

c  0+1 --> 1
c    (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧  p_1010) -> (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0)
c  in CNF:
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_2
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_1
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨  b^{101, 11}_0
c  in DIMACS:
 19427  19428  19429 -1010 -19430 0
 19427  19428  19429 -1010 -19431 0
 19427  19428  19429 -1010  19432 0

c  1+1 --> 2
c    (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0 ∧  p_1010) -> (-b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0)
c  in CNF:
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_2
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨  b^{101, 11}_1
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ -p_1010 ∨ -b^{101, 11}_0
c  in DIMACS:
 19427  19428 -19429 -1010 -19430 0
 19427  19428 -19429 -1010  19431 0
 19427  19428 -19429 -1010 -19432 0

c  2+1 --> break 
c    (-b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 19427 -19428  19429 -1010 1162 0


c  2-1 --> 1
c    (-b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧ -p_1010) -> (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0)
c  in CNF:
c     b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_2
c     b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_1
c     b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨  b^{101, 11}_0
c  in DIMACS:
 19427 -19428  19429  1010 -19430 0
 19427 -19428  19429  1010 -19431 0
 19427 -19428  19429  1010  19432 0

c  1-1 --> 0
c    (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0 ∧ -p_1010) -> (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧ -b^{101, 11}_0)
c  in CNF:
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_2
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_1
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_0
c  in DIMACS:
 19427  19428 -19429  1010 -19430 0
 19427  19428 -19429  1010 -19431 0
 19427  19428 -19429  1010 -19432 0

c  0-1 --> -1
c    (-b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧ -p_1010) -> ( b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0)
c  in CNF:
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨  b^{101, 11}_2
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_1
c     b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨  b^{101, 11}_0
c  in DIMACS:
 19427  19428  19429  1010  19430 0
 19427  19428  19429  1010 -19431 0
 19427  19428  19429  1010  19432 0

c  -1-1 --> -2
c    ( b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧  b^{101, 10}_0 ∧ -p_1010) -> ( b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0)
c  in CNF:
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨  b^{101, 11}_2
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨  b^{101, 11}_1
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨  p_1010 ∨ -b^{101, 11}_0
c  in DIMACS:
-19427  19428 -19429  1010  19430 0
-19427  19428 -19429  1010  19431 0
-19427  19428 -19429  1010 -19432 0

c  -2-1 --> break 
c    ( b^{101, 10}_2 ∧  b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨  b^{101, 10}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-19427 -19428  19429  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 10}_2 ∧ -b^{101, 10}_1 ∧ -b^{101, 10}_0 ∧ true) 
c  in CNF:
c    -b^{101, 10}_2 ∨  b^{101, 10}_1 ∨  b^{101, 10}_0 ∨ false 
c  in DIMACS:
-19427  19428  19429  0

c  3 does not represent an automaton state.
c    -(-b^{101, 10}_2 ∧  b^{101, 10}_1 ∧  b^{101, 10}_0 ∧ true) 
c  in CNF:
c     b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ false 
c  in DIMACS:
 19427 -19428 -19429  0
c  -3 does not represent an automaton state.
c    -( b^{101, 10}_2 ∧  b^{101, 10}_1 ∧  b^{101, 10}_0 ∧ true) 
c  in CNF:
c    -b^{101, 10}_2 ∨ -b^{101, 10}_1 ∨ -b^{101, 10}_0 ∨ false 
c  in DIMACS:
-19427 -19428 -19429  0

c i = 11
c  -2+1 --> -1
c    ( b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧  p_1111) -> ( b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧  b^{101, 12}_0)
c  in CNF:
c    -b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨  b^{101, 12}_2
c    -b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_1
c    -b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨  b^{101, 12}_0
c  in DIMACS:
-19430 -19431  19432 -1111  19433 0
-19430 -19431  19432 -1111 -19434 0
-19430 -19431  19432 -1111  19435 0

c  -1+1 --> 0
c    ( b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0 ∧  p_1111) -> (-b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧ -b^{101, 12}_0)
c  in CNF:
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_2
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_1
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_0
c  in DIMACS:
-19430  19431 -19432 -1111 -19433 0
-19430  19431 -19432 -1111 -19434 0
-19430  19431 -19432 -1111 -19435 0

c  0+1 --> 1
c    (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧  p_1111) -> (-b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧  b^{101, 12}_0)
c  in CNF:
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_2
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_1
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨  b^{101, 12}_0
c  in DIMACS:
 19430  19431  19432 -1111 -19433 0
 19430  19431  19432 -1111 -19434 0
 19430  19431  19432 -1111  19435 0

c  1+1 --> 2
c    (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0 ∧  p_1111) -> (-b^{101, 12}_2 ∧  b^{101, 12}_1 ∧ -b^{101, 12}_0)
c  in CNF:
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_2
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨  b^{101, 12}_1
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ -p_1111 ∨ -b^{101, 12}_0
c  in DIMACS:
 19430  19431 -19432 -1111 -19433 0
 19430  19431 -19432 -1111  19434 0
 19430  19431 -19432 -1111 -19435 0

c  2+1 --> break 
c    (-b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧  p_1111) -> break
c  in CNF:
c     b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ -p_1111 ∨ break
c  in DIMACS:
 19430 -19431  19432 -1111 1162 0


c  2-1 --> 1
c    (-b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧ -p_1111) -> (-b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧  b^{101, 12}_0)
c  in CNF:
c     b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_2
c     b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_1
c     b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨  b^{101, 12}_0
c  in DIMACS:
 19430 -19431  19432  1111 -19433 0
 19430 -19431  19432  1111 -19434 0
 19430 -19431  19432  1111  19435 0

c  1-1 --> 0
c    (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0 ∧ -p_1111) -> (-b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧ -b^{101, 12}_0)
c  in CNF:
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_2
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_1
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_0
c  in DIMACS:
 19430  19431 -19432  1111 -19433 0
 19430  19431 -19432  1111 -19434 0
 19430  19431 -19432  1111 -19435 0

c  0-1 --> -1
c    (-b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧ -p_1111) -> ( b^{101, 12}_2 ∧ -b^{101, 12}_1 ∧  b^{101, 12}_0)
c  in CNF:
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨  b^{101, 12}_2
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_1
c     b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨  b^{101, 12}_0
c  in DIMACS:
 19430  19431  19432  1111  19433 0
 19430  19431  19432  1111 -19434 0
 19430  19431  19432  1111  19435 0

c  -1-1 --> -2
c    ( b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧  b^{101, 11}_0 ∧ -p_1111) -> ( b^{101, 12}_2 ∧  b^{101, 12}_1 ∧ -b^{101, 12}_0)
c  in CNF:
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨  b^{101, 12}_2
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨  b^{101, 12}_1
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨  p_1111 ∨ -b^{101, 12}_0
c  in DIMACS:
-19430  19431 -19432  1111  19433 0
-19430  19431 -19432  1111  19434 0
-19430  19431 -19432  1111 -19435 0

c  -2-1 --> break 
c    ( b^{101, 11}_2 ∧  b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧ -p_1111) -> break
c  in CNF:
c    -b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨  b^{101, 11}_0 ∨  p_1111 ∨ break
c  in DIMACS:
-19430 -19431  19432  1111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{101, 11}_2 ∧ -b^{101, 11}_1 ∧ -b^{101, 11}_0 ∧ true) 
c  in CNF:
c    -b^{101, 11}_2 ∨  b^{101, 11}_1 ∨  b^{101, 11}_0 ∨ false 
c  in DIMACS:
-19430  19431  19432  0

c  3 does not represent an automaton state.
c    -(-b^{101, 11}_2 ∧  b^{101, 11}_1 ∧  b^{101, 11}_0 ∧ true) 
c  in CNF:
c     b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ false 
c  in DIMACS:
 19430 -19431 -19432  0
c  -3 does not represent an automaton state.
c    -( b^{101, 11}_2 ∧  b^{101, 11}_1 ∧  b^{101, 11}_0 ∧ true) 
c  in CNF:
c    -b^{101, 11}_2 ∨ -b^{101, 11}_1 ∨ -b^{101, 11}_0 ∨ false 
c  in DIMACS:
-19430 -19431 -19432  0

c INIT for k = 102
c    -b^{102, 1}_2
c    -b^{102, 1}_1
c    -b^{102, 1}_0
c  in DIMACS:
-19436 0
-19437 0
-19438 0

c Transitions for k = 102
c i = 1
c  -2+1 --> -1
c    ( b^{102, 1}_2 ∧  b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧  p_102) -> ( b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0)
c  in CNF:
c    -b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨  b^{102, 2}_2
c    -b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_1
c    -b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨  b^{102, 2}_0
c  in DIMACS:
-19436 -19437  19438 -102  19439 0
-19436 -19437  19438 -102 -19440 0
-19436 -19437  19438 -102  19441 0

c  -1+1 --> 0
c    ( b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧  b^{102, 1}_0 ∧  p_102) -> (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧ -b^{102, 2}_0)
c  in CNF:
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_2
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_1
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_0
c  in DIMACS:
-19436  19437 -19438 -102 -19439 0
-19436  19437 -19438 -102 -19440 0
-19436  19437 -19438 -102 -19441 0

c  0+1 --> 1
c    (-b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧  p_102) -> (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0)
c  in CNF:
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_2
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_1
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨  b^{102, 2}_0
c  in DIMACS:
 19436  19437  19438 -102 -19439 0
 19436  19437  19438 -102 -19440 0
 19436  19437  19438 -102  19441 0

c  1+1 --> 2
c    (-b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧  b^{102, 1}_0 ∧  p_102) -> (-b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0)
c  in CNF:
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_2
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨  b^{102, 2}_1
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ -p_102 ∨ -b^{102, 2}_0
c  in DIMACS:
 19436  19437 -19438 -102 -19439 0
 19436  19437 -19438 -102  19440 0
 19436  19437 -19438 -102 -19441 0

c  2+1 --> break 
c    (-b^{102, 1}_2 ∧  b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧  p_102) -> break
c  in CNF:
c     b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ -p_102 ∨ break
c  in DIMACS:
 19436 -19437  19438 -102 1162 0


c  2-1 --> 1
c    (-b^{102, 1}_2 ∧  b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧ -p_102) -> (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0)
c  in CNF:
c     b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_2
c     b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_1
c     b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨  b^{102, 2}_0
c  in DIMACS:
 19436 -19437  19438  102 -19439 0
 19436 -19437  19438  102 -19440 0
 19436 -19437  19438  102  19441 0

c  1-1 --> 0
c    (-b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧  b^{102, 1}_0 ∧ -p_102) -> (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧ -b^{102, 2}_0)
c  in CNF:
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_2
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_1
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_0
c  in DIMACS:
 19436  19437 -19438  102 -19439 0
 19436  19437 -19438  102 -19440 0
 19436  19437 -19438  102 -19441 0

c  0-1 --> -1
c    (-b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧ -p_102) -> ( b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0)
c  in CNF:
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨  b^{102, 2}_2
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_1
c     b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨  b^{102, 2}_0
c  in DIMACS:
 19436  19437  19438  102  19439 0
 19436  19437  19438  102 -19440 0
 19436  19437  19438  102  19441 0

c  -1-1 --> -2
c    ( b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧  b^{102, 1}_0 ∧ -p_102) -> ( b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0)
c  in CNF:
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨  b^{102, 2}_2
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨  b^{102, 2}_1
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨  p_102 ∨ -b^{102, 2}_0
c  in DIMACS:
-19436  19437 -19438  102  19439 0
-19436  19437 -19438  102  19440 0
-19436  19437 -19438  102 -19441 0

c  -2-1 --> break 
c    ( b^{102, 1}_2 ∧  b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧ -p_102) -> break
c  in CNF:
c    -b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨  b^{102, 1}_0 ∨  p_102 ∨ break
c  in DIMACS:
-19436 -19437  19438  102 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 1}_2 ∧ -b^{102, 1}_1 ∧ -b^{102, 1}_0 ∧ true) 
c  in CNF:
c    -b^{102, 1}_2 ∨  b^{102, 1}_1 ∨  b^{102, 1}_0 ∨ false 
c  in DIMACS:
-19436  19437  19438  0

c  3 does not represent an automaton state.
c    -(-b^{102, 1}_2 ∧  b^{102, 1}_1 ∧  b^{102, 1}_0 ∧ true) 
c  in CNF:
c     b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ false 
c  in DIMACS:
 19436 -19437 -19438  0
c  -3 does not represent an automaton state.
c    -( b^{102, 1}_2 ∧  b^{102, 1}_1 ∧  b^{102, 1}_0 ∧ true) 
c  in CNF:
c    -b^{102, 1}_2 ∨ -b^{102, 1}_1 ∨ -b^{102, 1}_0 ∨ false 
c  in DIMACS:
-19436 -19437 -19438  0

c i = 2
c  -2+1 --> -1
c    ( b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧  p_204) -> ( b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0)
c  in CNF:
c    -b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨  b^{102, 3}_2
c    -b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_1
c    -b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨  b^{102, 3}_0
c  in DIMACS:
-19439 -19440  19441 -204  19442 0
-19439 -19440  19441 -204 -19443 0
-19439 -19440  19441 -204  19444 0

c  -1+1 --> 0
c    ( b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0 ∧  p_204) -> (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧ -b^{102, 3}_0)
c  in CNF:
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_2
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_1
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_0
c  in DIMACS:
-19439  19440 -19441 -204 -19442 0
-19439  19440 -19441 -204 -19443 0
-19439  19440 -19441 -204 -19444 0

c  0+1 --> 1
c    (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧  p_204) -> (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0)
c  in CNF:
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_2
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_1
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨  b^{102, 3}_0
c  in DIMACS:
 19439  19440  19441 -204 -19442 0
 19439  19440  19441 -204 -19443 0
 19439  19440  19441 -204  19444 0

c  1+1 --> 2
c    (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0 ∧  p_204) -> (-b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0)
c  in CNF:
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_2
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨  b^{102, 3}_1
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ -p_204 ∨ -b^{102, 3}_0
c  in DIMACS:
 19439  19440 -19441 -204 -19442 0
 19439  19440 -19441 -204  19443 0
 19439  19440 -19441 -204 -19444 0

c  2+1 --> break 
c    (-b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧  p_204) -> break
c  in CNF:
c     b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 19439 -19440  19441 -204 1162 0


c  2-1 --> 1
c    (-b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧ -p_204) -> (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0)
c  in CNF:
c     b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_2
c     b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_1
c     b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨  b^{102, 3}_0
c  in DIMACS:
 19439 -19440  19441  204 -19442 0
 19439 -19440  19441  204 -19443 0
 19439 -19440  19441  204  19444 0

c  1-1 --> 0
c    (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0 ∧ -p_204) -> (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧ -b^{102, 3}_0)
c  in CNF:
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_2
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_1
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_0
c  in DIMACS:
 19439  19440 -19441  204 -19442 0
 19439  19440 -19441  204 -19443 0
 19439  19440 -19441  204 -19444 0

c  0-1 --> -1
c    (-b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧ -p_204) -> ( b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0)
c  in CNF:
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨  b^{102, 3}_2
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_1
c     b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨  b^{102, 3}_0
c  in DIMACS:
 19439  19440  19441  204  19442 0
 19439  19440  19441  204 -19443 0
 19439  19440  19441  204  19444 0

c  -1-1 --> -2
c    ( b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧  b^{102, 2}_0 ∧ -p_204) -> ( b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0)
c  in CNF:
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨  b^{102, 3}_2
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨  b^{102, 3}_1
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨  p_204 ∨ -b^{102, 3}_0
c  in DIMACS:
-19439  19440 -19441  204  19442 0
-19439  19440 -19441  204  19443 0
-19439  19440 -19441  204 -19444 0

c  -2-1 --> break 
c    ( b^{102, 2}_2 ∧  b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨  b^{102, 2}_0 ∨  p_204 ∨ break
c  in DIMACS:
-19439 -19440  19441  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 2}_2 ∧ -b^{102, 2}_1 ∧ -b^{102, 2}_0 ∧ true) 
c  in CNF:
c    -b^{102, 2}_2 ∨  b^{102, 2}_1 ∨  b^{102, 2}_0 ∨ false 
c  in DIMACS:
-19439  19440  19441  0

c  3 does not represent an automaton state.
c    -(-b^{102, 2}_2 ∧  b^{102, 2}_1 ∧  b^{102, 2}_0 ∧ true) 
c  in CNF:
c     b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ false 
c  in DIMACS:
 19439 -19440 -19441  0
c  -3 does not represent an automaton state.
c    -( b^{102, 2}_2 ∧  b^{102, 2}_1 ∧  b^{102, 2}_0 ∧ true) 
c  in CNF:
c    -b^{102, 2}_2 ∨ -b^{102, 2}_1 ∨ -b^{102, 2}_0 ∨ false 
c  in DIMACS:
-19439 -19440 -19441  0

c i = 3
c  -2+1 --> -1
c    ( b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧  p_306) -> ( b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0)
c  in CNF:
c    -b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨  b^{102, 4}_2
c    -b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_1
c    -b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨  b^{102, 4}_0
c  in DIMACS:
-19442 -19443  19444 -306  19445 0
-19442 -19443  19444 -306 -19446 0
-19442 -19443  19444 -306  19447 0

c  -1+1 --> 0
c    ( b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0 ∧  p_306) -> (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧ -b^{102, 4}_0)
c  in CNF:
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_2
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_1
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_0
c  in DIMACS:
-19442  19443 -19444 -306 -19445 0
-19442  19443 -19444 -306 -19446 0
-19442  19443 -19444 -306 -19447 0

c  0+1 --> 1
c    (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧  p_306) -> (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0)
c  in CNF:
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_2
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_1
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨  b^{102, 4}_0
c  in DIMACS:
 19442  19443  19444 -306 -19445 0
 19442  19443  19444 -306 -19446 0
 19442  19443  19444 -306  19447 0

c  1+1 --> 2
c    (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0 ∧  p_306) -> (-b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0)
c  in CNF:
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_2
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨  b^{102, 4}_1
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ -p_306 ∨ -b^{102, 4}_0
c  in DIMACS:
 19442  19443 -19444 -306 -19445 0
 19442  19443 -19444 -306  19446 0
 19442  19443 -19444 -306 -19447 0

c  2+1 --> break 
c    (-b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧  p_306) -> break
c  in CNF:
c     b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 19442 -19443  19444 -306 1162 0


c  2-1 --> 1
c    (-b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧ -p_306) -> (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0)
c  in CNF:
c     b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_2
c     b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_1
c     b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨  b^{102, 4}_0
c  in DIMACS:
 19442 -19443  19444  306 -19445 0
 19442 -19443  19444  306 -19446 0
 19442 -19443  19444  306  19447 0

c  1-1 --> 0
c    (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0 ∧ -p_306) -> (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧ -b^{102, 4}_0)
c  in CNF:
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_2
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_1
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_0
c  in DIMACS:
 19442  19443 -19444  306 -19445 0
 19442  19443 -19444  306 -19446 0
 19442  19443 -19444  306 -19447 0

c  0-1 --> -1
c    (-b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧ -p_306) -> ( b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0)
c  in CNF:
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨  b^{102, 4}_2
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_1
c     b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨  b^{102, 4}_0
c  in DIMACS:
 19442  19443  19444  306  19445 0
 19442  19443  19444  306 -19446 0
 19442  19443  19444  306  19447 0

c  -1-1 --> -2
c    ( b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧  b^{102, 3}_0 ∧ -p_306) -> ( b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0)
c  in CNF:
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨  b^{102, 4}_2
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨  b^{102, 4}_1
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨  p_306 ∨ -b^{102, 4}_0
c  in DIMACS:
-19442  19443 -19444  306  19445 0
-19442  19443 -19444  306  19446 0
-19442  19443 -19444  306 -19447 0

c  -2-1 --> break 
c    ( b^{102, 3}_2 ∧  b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨  b^{102, 3}_0 ∨  p_306 ∨ break
c  in DIMACS:
-19442 -19443  19444  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 3}_2 ∧ -b^{102, 3}_1 ∧ -b^{102, 3}_0 ∧ true) 
c  in CNF:
c    -b^{102, 3}_2 ∨  b^{102, 3}_1 ∨  b^{102, 3}_0 ∨ false 
c  in DIMACS:
-19442  19443  19444  0

c  3 does not represent an automaton state.
c    -(-b^{102, 3}_2 ∧  b^{102, 3}_1 ∧  b^{102, 3}_0 ∧ true) 
c  in CNF:
c     b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ false 
c  in DIMACS:
 19442 -19443 -19444  0
c  -3 does not represent an automaton state.
c    -( b^{102, 3}_2 ∧  b^{102, 3}_1 ∧  b^{102, 3}_0 ∧ true) 
c  in CNF:
c    -b^{102, 3}_2 ∨ -b^{102, 3}_1 ∨ -b^{102, 3}_0 ∨ false 
c  in DIMACS:
-19442 -19443 -19444  0

c i = 4
c  -2+1 --> -1
c    ( b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧  p_408) -> ( b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0)
c  in CNF:
c    -b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨  b^{102, 5}_2
c    -b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_1
c    -b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨  b^{102, 5}_0
c  in DIMACS:
-19445 -19446  19447 -408  19448 0
-19445 -19446  19447 -408 -19449 0
-19445 -19446  19447 -408  19450 0

c  -1+1 --> 0
c    ( b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0 ∧  p_408) -> (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧ -b^{102, 5}_0)
c  in CNF:
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_2
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_1
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_0
c  in DIMACS:
-19445  19446 -19447 -408 -19448 0
-19445  19446 -19447 -408 -19449 0
-19445  19446 -19447 -408 -19450 0

c  0+1 --> 1
c    (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧  p_408) -> (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0)
c  in CNF:
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_2
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_1
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨  b^{102, 5}_0
c  in DIMACS:
 19445  19446  19447 -408 -19448 0
 19445  19446  19447 -408 -19449 0
 19445  19446  19447 -408  19450 0

c  1+1 --> 2
c    (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0 ∧  p_408) -> (-b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0)
c  in CNF:
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_2
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨  b^{102, 5}_1
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ -p_408 ∨ -b^{102, 5}_0
c  in DIMACS:
 19445  19446 -19447 -408 -19448 0
 19445  19446 -19447 -408  19449 0
 19445  19446 -19447 -408 -19450 0

c  2+1 --> break 
c    (-b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧  p_408) -> break
c  in CNF:
c     b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 19445 -19446  19447 -408 1162 0


c  2-1 --> 1
c    (-b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧ -p_408) -> (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0)
c  in CNF:
c     b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_2
c     b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_1
c     b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨  b^{102, 5}_0
c  in DIMACS:
 19445 -19446  19447  408 -19448 0
 19445 -19446  19447  408 -19449 0
 19445 -19446  19447  408  19450 0

c  1-1 --> 0
c    (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0 ∧ -p_408) -> (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧ -b^{102, 5}_0)
c  in CNF:
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_2
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_1
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_0
c  in DIMACS:
 19445  19446 -19447  408 -19448 0
 19445  19446 -19447  408 -19449 0
 19445  19446 -19447  408 -19450 0

c  0-1 --> -1
c    (-b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧ -p_408) -> ( b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0)
c  in CNF:
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨  b^{102, 5}_2
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_1
c     b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨  b^{102, 5}_0
c  in DIMACS:
 19445  19446  19447  408  19448 0
 19445  19446  19447  408 -19449 0
 19445  19446  19447  408  19450 0

c  -1-1 --> -2
c    ( b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧  b^{102, 4}_0 ∧ -p_408) -> ( b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0)
c  in CNF:
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨  b^{102, 5}_2
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨  b^{102, 5}_1
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨  p_408 ∨ -b^{102, 5}_0
c  in DIMACS:
-19445  19446 -19447  408  19448 0
-19445  19446 -19447  408  19449 0
-19445  19446 -19447  408 -19450 0

c  -2-1 --> break 
c    ( b^{102, 4}_2 ∧  b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨  b^{102, 4}_0 ∨  p_408 ∨ break
c  in DIMACS:
-19445 -19446  19447  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 4}_2 ∧ -b^{102, 4}_1 ∧ -b^{102, 4}_0 ∧ true) 
c  in CNF:
c    -b^{102, 4}_2 ∨  b^{102, 4}_1 ∨  b^{102, 4}_0 ∨ false 
c  in DIMACS:
-19445  19446  19447  0

c  3 does not represent an automaton state.
c    -(-b^{102, 4}_2 ∧  b^{102, 4}_1 ∧  b^{102, 4}_0 ∧ true) 
c  in CNF:
c     b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ false 
c  in DIMACS:
 19445 -19446 -19447  0
c  -3 does not represent an automaton state.
c    -( b^{102, 4}_2 ∧  b^{102, 4}_1 ∧  b^{102, 4}_0 ∧ true) 
c  in CNF:
c    -b^{102, 4}_2 ∨ -b^{102, 4}_1 ∨ -b^{102, 4}_0 ∨ false 
c  in DIMACS:
-19445 -19446 -19447  0

c i = 5
c  -2+1 --> -1
c    ( b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧  p_510) -> ( b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0)
c  in CNF:
c    -b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨  b^{102, 6}_2
c    -b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_1
c    -b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨  b^{102, 6}_0
c  in DIMACS:
-19448 -19449  19450 -510  19451 0
-19448 -19449  19450 -510 -19452 0
-19448 -19449  19450 -510  19453 0

c  -1+1 --> 0
c    ( b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0 ∧  p_510) -> (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧ -b^{102, 6}_0)
c  in CNF:
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_2
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_1
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_0
c  in DIMACS:
-19448  19449 -19450 -510 -19451 0
-19448  19449 -19450 -510 -19452 0
-19448  19449 -19450 -510 -19453 0

c  0+1 --> 1
c    (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧  p_510) -> (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0)
c  in CNF:
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_2
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_1
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨  b^{102, 6}_0
c  in DIMACS:
 19448  19449  19450 -510 -19451 0
 19448  19449  19450 -510 -19452 0
 19448  19449  19450 -510  19453 0

c  1+1 --> 2
c    (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0 ∧  p_510) -> (-b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0)
c  in CNF:
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_2
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨  b^{102, 6}_1
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ -p_510 ∨ -b^{102, 6}_0
c  in DIMACS:
 19448  19449 -19450 -510 -19451 0
 19448  19449 -19450 -510  19452 0
 19448  19449 -19450 -510 -19453 0

c  2+1 --> break 
c    (-b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧  p_510) -> break
c  in CNF:
c     b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 19448 -19449  19450 -510 1162 0


c  2-1 --> 1
c    (-b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧ -p_510) -> (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0)
c  in CNF:
c     b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_2
c     b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_1
c     b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨  b^{102, 6}_0
c  in DIMACS:
 19448 -19449  19450  510 -19451 0
 19448 -19449  19450  510 -19452 0
 19448 -19449  19450  510  19453 0

c  1-1 --> 0
c    (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0 ∧ -p_510) -> (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧ -b^{102, 6}_0)
c  in CNF:
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_2
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_1
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_0
c  in DIMACS:
 19448  19449 -19450  510 -19451 0
 19448  19449 -19450  510 -19452 0
 19448  19449 -19450  510 -19453 0

c  0-1 --> -1
c    (-b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧ -p_510) -> ( b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0)
c  in CNF:
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨  b^{102, 6}_2
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_1
c     b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨  b^{102, 6}_0
c  in DIMACS:
 19448  19449  19450  510  19451 0
 19448  19449  19450  510 -19452 0
 19448  19449  19450  510  19453 0

c  -1-1 --> -2
c    ( b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧  b^{102, 5}_0 ∧ -p_510) -> ( b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0)
c  in CNF:
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨  b^{102, 6}_2
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨  b^{102, 6}_1
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨  p_510 ∨ -b^{102, 6}_0
c  in DIMACS:
-19448  19449 -19450  510  19451 0
-19448  19449 -19450  510  19452 0
-19448  19449 -19450  510 -19453 0

c  -2-1 --> break 
c    ( b^{102, 5}_2 ∧  b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨  b^{102, 5}_0 ∨  p_510 ∨ break
c  in DIMACS:
-19448 -19449  19450  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 5}_2 ∧ -b^{102, 5}_1 ∧ -b^{102, 5}_0 ∧ true) 
c  in CNF:
c    -b^{102, 5}_2 ∨  b^{102, 5}_1 ∨  b^{102, 5}_0 ∨ false 
c  in DIMACS:
-19448  19449  19450  0

c  3 does not represent an automaton state.
c    -(-b^{102, 5}_2 ∧  b^{102, 5}_1 ∧  b^{102, 5}_0 ∧ true) 
c  in CNF:
c     b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ false 
c  in DIMACS:
 19448 -19449 -19450  0
c  -3 does not represent an automaton state.
c    -( b^{102, 5}_2 ∧  b^{102, 5}_1 ∧  b^{102, 5}_0 ∧ true) 
c  in CNF:
c    -b^{102, 5}_2 ∨ -b^{102, 5}_1 ∨ -b^{102, 5}_0 ∨ false 
c  in DIMACS:
-19448 -19449 -19450  0

c i = 6
c  -2+1 --> -1
c    ( b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧  p_612) -> ( b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0)
c  in CNF:
c    -b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨  b^{102, 7}_2
c    -b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_1
c    -b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨  b^{102, 7}_0
c  in DIMACS:
-19451 -19452  19453 -612  19454 0
-19451 -19452  19453 -612 -19455 0
-19451 -19452  19453 -612  19456 0

c  -1+1 --> 0
c    ( b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0 ∧  p_612) -> (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧ -b^{102, 7}_0)
c  in CNF:
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_2
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_1
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_0
c  in DIMACS:
-19451  19452 -19453 -612 -19454 0
-19451  19452 -19453 -612 -19455 0
-19451  19452 -19453 -612 -19456 0

c  0+1 --> 1
c    (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧  p_612) -> (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0)
c  in CNF:
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_2
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_1
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨  b^{102, 7}_0
c  in DIMACS:
 19451  19452  19453 -612 -19454 0
 19451  19452  19453 -612 -19455 0
 19451  19452  19453 -612  19456 0

c  1+1 --> 2
c    (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0 ∧  p_612) -> (-b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0)
c  in CNF:
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_2
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨  b^{102, 7}_1
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ -p_612 ∨ -b^{102, 7}_0
c  in DIMACS:
 19451  19452 -19453 -612 -19454 0
 19451  19452 -19453 -612  19455 0
 19451  19452 -19453 -612 -19456 0

c  2+1 --> break 
c    (-b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧  p_612) -> break
c  in CNF:
c     b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 19451 -19452  19453 -612 1162 0


c  2-1 --> 1
c    (-b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧ -p_612) -> (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0)
c  in CNF:
c     b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_2
c     b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_1
c     b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨  b^{102, 7}_0
c  in DIMACS:
 19451 -19452  19453  612 -19454 0
 19451 -19452  19453  612 -19455 0
 19451 -19452  19453  612  19456 0

c  1-1 --> 0
c    (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0 ∧ -p_612) -> (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧ -b^{102, 7}_0)
c  in CNF:
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_2
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_1
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_0
c  in DIMACS:
 19451  19452 -19453  612 -19454 0
 19451  19452 -19453  612 -19455 0
 19451  19452 -19453  612 -19456 0

c  0-1 --> -1
c    (-b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧ -p_612) -> ( b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0)
c  in CNF:
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨  b^{102, 7}_2
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_1
c     b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨  b^{102, 7}_0
c  in DIMACS:
 19451  19452  19453  612  19454 0
 19451  19452  19453  612 -19455 0
 19451  19452  19453  612  19456 0

c  -1-1 --> -2
c    ( b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧  b^{102, 6}_0 ∧ -p_612) -> ( b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0)
c  in CNF:
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨  b^{102, 7}_2
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨  b^{102, 7}_1
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨  p_612 ∨ -b^{102, 7}_0
c  in DIMACS:
-19451  19452 -19453  612  19454 0
-19451  19452 -19453  612  19455 0
-19451  19452 -19453  612 -19456 0

c  -2-1 --> break 
c    ( b^{102, 6}_2 ∧  b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨  b^{102, 6}_0 ∨  p_612 ∨ break
c  in DIMACS:
-19451 -19452  19453  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 6}_2 ∧ -b^{102, 6}_1 ∧ -b^{102, 6}_0 ∧ true) 
c  in CNF:
c    -b^{102, 6}_2 ∨  b^{102, 6}_1 ∨  b^{102, 6}_0 ∨ false 
c  in DIMACS:
-19451  19452  19453  0

c  3 does not represent an automaton state.
c    -(-b^{102, 6}_2 ∧  b^{102, 6}_1 ∧  b^{102, 6}_0 ∧ true) 
c  in CNF:
c     b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ false 
c  in DIMACS:
 19451 -19452 -19453  0
c  -3 does not represent an automaton state.
c    -( b^{102, 6}_2 ∧  b^{102, 6}_1 ∧  b^{102, 6}_0 ∧ true) 
c  in CNF:
c    -b^{102, 6}_2 ∨ -b^{102, 6}_1 ∨ -b^{102, 6}_0 ∨ false 
c  in DIMACS:
-19451 -19452 -19453  0

c i = 7
c  -2+1 --> -1
c    ( b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧  p_714) -> ( b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0)
c  in CNF:
c    -b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨  b^{102, 8}_2
c    -b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_1
c    -b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨  b^{102, 8}_0
c  in DIMACS:
-19454 -19455  19456 -714  19457 0
-19454 -19455  19456 -714 -19458 0
-19454 -19455  19456 -714  19459 0

c  -1+1 --> 0
c    ( b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0 ∧  p_714) -> (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧ -b^{102, 8}_0)
c  in CNF:
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_2
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_1
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_0
c  in DIMACS:
-19454  19455 -19456 -714 -19457 0
-19454  19455 -19456 -714 -19458 0
-19454  19455 -19456 -714 -19459 0

c  0+1 --> 1
c    (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧  p_714) -> (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0)
c  in CNF:
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_2
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_1
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨  b^{102, 8}_0
c  in DIMACS:
 19454  19455  19456 -714 -19457 0
 19454  19455  19456 -714 -19458 0
 19454  19455  19456 -714  19459 0

c  1+1 --> 2
c    (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0 ∧  p_714) -> (-b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0)
c  in CNF:
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_2
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨  b^{102, 8}_1
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ -p_714 ∨ -b^{102, 8}_0
c  in DIMACS:
 19454  19455 -19456 -714 -19457 0
 19454  19455 -19456 -714  19458 0
 19454  19455 -19456 -714 -19459 0

c  2+1 --> break 
c    (-b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧  p_714) -> break
c  in CNF:
c     b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 19454 -19455  19456 -714 1162 0


c  2-1 --> 1
c    (-b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧ -p_714) -> (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0)
c  in CNF:
c     b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_2
c     b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_1
c     b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨  b^{102, 8}_0
c  in DIMACS:
 19454 -19455  19456  714 -19457 0
 19454 -19455  19456  714 -19458 0
 19454 -19455  19456  714  19459 0

c  1-1 --> 0
c    (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0 ∧ -p_714) -> (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧ -b^{102, 8}_0)
c  in CNF:
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_2
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_1
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_0
c  in DIMACS:
 19454  19455 -19456  714 -19457 0
 19454  19455 -19456  714 -19458 0
 19454  19455 -19456  714 -19459 0

c  0-1 --> -1
c    (-b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧ -p_714) -> ( b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0)
c  in CNF:
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨  b^{102, 8}_2
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_1
c     b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨  b^{102, 8}_0
c  in DIMACS:
 19454  19455  19456  714  19457 0
 19454  19455  19456  714 -19458 0
 19454  19455  19456  714  19459 0

c  -1-1 --> -2
c    ( b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧  b^{102, 7}_0 ∧ -p_714) -> ( b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0)
c  in CNF:
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨  b^{102, 8}_2
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨  b^{102, 8}_1
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨  p_714 ∨ -b^{102, 8}_0
c  in DIMACS:
-19454  19455 -19456  714  19457 0
-19454  19455 -19456  714  19458 0
-19454  19455 -19456  714 -19459 0

c  -2-1 --> break 
c    ( b^{102, 7}_2 ∧  b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨  b^{102, 7}_0 ∨  p_714 ∨ break
c  in DIMACS:
-19454 -19455  19456  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 7}_2 ∧ -b^{102, 7}_1 ∧ -b^{102, 7}_0 ∧ true) 
c  in CNF:
c    -b^{102, 7}_2 ∨  b^{102, 7}_1 ∨  b^{102, 7}_0 ∨ false 
c  in DIMACS:
-19454  19455  19456  0

c  3 does not represent an automaton state.
c    -(-b^{102, 7}_2 ∧  b^{102, 7}_1 ∧  b^{102, 7}_0 ∧ true) 
c  in CNF:
c     b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ false 
c  in DIMACS:
 19454 -19455 -19456  0
c  -3 does not represent an automaton state.
c    -( b^{102, 7}_2 ∧  b^{102, 7}_1 ∧  b^{102, 7}_0 ∧ true) 
c  in CNF:
c    -b^{102, 7}_2 ∨ -b^{102, 7}_1 ∨ -b^{102, 7}_0 ∨ false 
c  in DIMACS:
-19454 -19455 -19456  0

c i = 8
c  -2+1 --> -1
c    ( b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧  p_816) -> ( b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0)
c  in CNF:
c    -b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨  b^{102, 9}_2
c    -b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_1
c    -b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨  b^{102, 9}_0
c  in DIMACS:
-19457 -19458  19459 -816  19460 0
-19457 -19458  19459 -816 -19461 0
-19457 -19458  19459 -816  19462 0

c  -1+1 --> 0
c    ( b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0 ∧  p_816) -> (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧ -b^{102, 9}_0)
c  in CNF:
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_2
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_1
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_0
c  in DIMACS:
-19457  19458 -19459 -816 -19460 0
-19457  19458 -19459 -816 -19461 0
-19457  19458 -19459 -816 -19462 0

c  0+1 --> 1
c    (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧  p_816) -> (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0)
c  in CNF:
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_2
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_1
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨  b^{102, 9}_0
c  in DIMACS:
 19457  19458  19459 -816 -19460 0
 19457  19458  19459 -816 -19461 0
 19457  19458  19459 -816  19462 0

c  1+1 --> 2
c    (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0 ∧  p_816) -> (-b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0)
c  in CNF:
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_2
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨  b^{102, 9}_1
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ -p_816 ∨ -b^{102, 9}_0
c  in DIMACS:
 19457  19458 -19459 -816 -19460 0
 19457  19458 -19459 -816  19461 0
 19457  19458 -19459 -816 -19462 0

c  2+1 --> break 
c    (-b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧  p_816) -> break
c  in CNF:
c     b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 19457 -19458  19459 -816 1162 0


c  2-1 --> 1
c    (-b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧ -p_816) -> (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0)
c  in CNF:
c     b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_2
c     b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_1
c     b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨  b^{102, 9}_0
c  in DIMACS:
 19457 -19458  19459  816 -19460 0
 19457 -19458  19459  816 -19461 0
 19457 -19458  19459  816  19462 0

c  1-1 --> 0
c    (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0 ∧ -p_816) -> (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧ -b^{102, 9}_0)
c  in CNF:
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_2
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_1
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_0
c  in DIMACS:
 19457  19458 -19459  816 -19460 0
 19457  19458 -19459  816 -19461 0
 19457  19458 -19459  816 -19462 0

c  0-1 --> -1
c    (-b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧ -p_816) -> ( b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0)
c  in CNF:
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨  b^{102, 9}_2
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_1
c     b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨  b^{102, 9}_0
c  in DIMACS:
 19457  19458  19459  816  19460 0
 19457  19458  19459  816 -19461 0
 19457  19458  19459  816  19462 0

c  -1-1 --> -2
c    ( b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧  b^{102, 8}_0 ∧ -p_816) -> ( b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0)
c  in CNF:
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨  b^{102, 9}_2
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨  b^{102, 9}_1
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨  p_816 ∨ -b^{102, 9}_0
c  in DIMACS:
-19457  19458 -19459  816  19460 0
-19457  19458 -19459  816  19461 0
-19457  19458 -19459  816 -19462 0

c  -2-1 --> break 
c    ( b^{102, 8}_2 ∧  b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨  b^{102, 8}_0 ∨  p_816 ∨ break
c  in DIMACS:
-19457 -19458  19459  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 8}_2 ∧ -b^{102, 8}_1 ∧ -b^{102, 8}_0 ∧ true) 
c  in CNF:
c    -b^{102, 8}_2 ∨  b^{102, 8}_1 ∨  b^{102, 8}_0 ∨ false 
c  in DIMACS:
-19457  19458  19459  0

c  3 does not represent an automaton state.
c    -(-b^{102, 8}_2 ∧  b^{102, 8}_1 ∧  b^{102, 8}_0 ∧ true) 
c  in CNF:
c     b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ false 
c  in DIMACS:
 19457 -19458 -19459  0
c  -3 does not represent an automaton state.
c    -( b^{102, 8}_2 ∧  b^{102, 8}_1 ∧  b^{102, 8}_0 ∧ true) 
c  in CNF:
c    -b^{102, 8}_2 ∨ -b^{102, 8}_1 ∨ -b^{102, 8}_0 ∨ false 
c  in DIMACS:
-19457 -19458 -19459  0

c i = 9
c  -2+1 --> -1
c    ( b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧  p_918) -> ( b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0)
c  in CNF:
c    -b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨  b^{102, 10}_2
c    -b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_1
c    -b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨  b^{102, 10}_0
c  in DIMACS:
-19460 -19461  19462 -918  19463 0
-19460 -19461  19462 -918 -19464 0
-19460 -19461  19462 -918  19465 0

c  -1+1 --> 0
c    ( b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0 ∧  p_918) -> (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧ -b^{102, 10}_0)
c  in CNF:
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_2
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_1
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_0
c  in DIMACS:
-19460  19461 -19462 -918 -19463 0
-19460  19461 -19462 -918 -19464 0
-19460  19461 -19462 -918 -19465 0

c  0+1 --> 1
c    (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧  p_918) -> (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0)
c  in CNF:
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_2
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_1
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨  b^{102, 10}_0
c  in DIMACS:
 19460  19461  19462 -918 -19463 0
 19460  19461  19462 -918 -19464 0
 19460  19461  19462 -918  19465 0

c  1+1 --> 2
c    (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0 ∧  p_918) -> (-b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0)
c  in CNF:
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_2
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨  b^{102, 10}_1
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ -p_918 ∨ -b^{102, 10}_0
c  in DIMACS:
 19460  19461 -19462 -918 -19463 0
 19460  19461 -19462 -918  19464 0
 19460  19461 -19462 -918 -19465 0

c  2+1 --> break 
c    (-b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧  p_918) -> break
c  in CNF:
c     b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 19460 -19461  19462 -918 1162 0


c  2-1 --> 1
c    (-b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧ -p_918) -> (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0)
c  in CNF:
c     b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_2
c     b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_1
c     b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨  b^{102, 10}_0
c  in DIMACS:
 19460 -19461  19462  918 -19463 0
 19460 -19461  19462  918 -19464 0
 19460 -19461  19462  918  19465 0

c  1-1 --> 0
c    (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0 ∧ -p_918) -> (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧ -b^{102, 10}_0)
c  in CNF:
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_2
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_1
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_0
c  in DIMACS:
 19460  19461 -19462  918 -19463 0
 19460  19461 -19462  918 -19464 0
 19460  19461 -19462  918 -19465 0

c  0-1 --> -1
c    (-b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧ -p_918) -> ( b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0)
c  in CNF:
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨  b^{102, 10}_2
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_1
c     b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨  b^{102, 10}_0
c  in DIMACS:
 19460  19461  19462  918  19463 0
 19460  19461  19462  918 -19464 0
 19460  19461  19462  918  19465 0

c  -1-1 --> -2
c    ( b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧  b^{102, 9}_0 ∧ -p_918) -> ( b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0)
c  in CNF:
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨  b^{102, 10}_2
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨  b^{102, 10}_1
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨  p_918 ∨ -b^{102, 10}_0
c  in DIMACS:
-19460  19461 -19462  918  19463 0
-19460  19461 -19462  918  19464 0
-19460  19461 -19462  918 -19465 0

c  -2-1 --> break 
c    ( b^{102, 9}_2 ∧  b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨  b^{102, 9}_0 ∨  p_918 ∨ break
c  in DIMACS:
-19460 -19461  19462  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 9}_2 ∧ -b^{102, 9}_1 ∧ -b^{102, 9}_0 ∧ true) 
c  in CNF:
c    -b^{102, 9}_2 ∨  b^{102, 9}_1 ∨  b^{102, 9}_0 ∨ false 
c  in DIMACS:
-19460  19461  19462  0

c  3 does not represent an automaton state.
c    -(-b^{102, 9}_2 ∧  b^{102, 9}_1 ∧  b^{102, 9}_0 ∧ true) 
c  in CNF:
c     b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ false 
c  in DIMACS:
 19460 -19461 -19462  0
c  -3 does not represent an automaton state.
c    -( b^{102, 9}_2 ∧  b^{102, 9}_1 ∧  b^{102, 9}_0 ∧ true) 
c  in CNF:
c    -b^{102, 9}_2 ∨ -b^{102, 9}_1 ∨ -b^{102, 9}_0 ∨ false 
c  in DIMACS:
-19460 -19461 -19462  0

c i = 10
c  -2+1 --> -1
c    ( b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧  p_1020) -> ( b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0)
c  in CNF:
c    -b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨  b^{102, 11}_2
c    -b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_1
c    -b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨  b^{102, 11}_0
c  in DIMACS:
-19463 -19464  19465 -1020  19466 0
-19463 -19464  19465 -1020 -19467 0
-19463 -19464  19465 -1020  19468 0

c  -1+1 --> 0
c    ( b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0 ∧  p_1020) -> (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧ -b^{102, 11}_0)
c  in CNF:
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_2
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_1
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_0
c  in DIMACS:
-19463  19464 -19465 -1020 -19466 0
-19463  19464 -19465 -1020 -19467 0
-19463  19464 -19465 -1020 -19468 0

c  0+1 --> 1
c    (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧  p_1020) -> (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0)
c  in CNF:
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_2
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_1
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨  b^{102, 11}_0
c  in DIMACS:
 19463  19464  19465 -1020 -19466 0
 19463  19464  19465 -1020 -19467 0
 19463  19464  19465 -1020  19468 0

c  1+1 --> 2
c    (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0 ∧  p_1020) -> (-b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0)
c  in CNF:
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_2
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨  b^{102, 11}_1
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ -p_1020 ∨ -b^{102, 11}_0
c  in DIMACS:
 19463  19464 -19465 -1020 -19466 0
 19463  19464 -19465 -1020  19467 0
 19463  19464 -19465 -1020 -19468 0

c  2+1 --> break 
c    (-b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 19463 -19464  19465 -1020 1162 0


c  2-1 --> 1
c    (-b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧ -p_1020) -> (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0)
c  in CNF:
c     b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_2
c     b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_1
c     b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨  b^{102, 11}_0
c  in DIMACS:
 19463 -19464  19465  1020 -19466 0
 19463 -19464  19465  1020 -19467 0
 19463 -19464  19465  1020  19468 0

c  1-1 --> 0
c    (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0 ∧ -p_1020) -> (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧ -b^{102, 11}_0)
c  in CNF:
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_2
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_1
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_0
c  in DIMACS:
 19463  19464 -19465  1020 -19466 0
 19463  19464 -19465  1020 -19467 0
 19463  19464 -19465  1020 -19468 0

c  0-1 --> -1
c    (-b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧ -p_1020) -> ( b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0)
c  in CNF:
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨  b^{102, 11}_2
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_1
c     b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨  b^{102, 11}_0
c  in DIMACS:
 19463  19464  19465  1020  19466 0
 19463  19464  19465  1020 -19467 0
 19463  19464  19465  1020  19468 0

c  -1-1 --> -2
c    ( b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧  b^{102, 10}_0 ∧ -p_1020) -> ( b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0)
c  in CNF:
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨  b^{102, 11}_2
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨  b^{102, 11}_1
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨  p_1020 ∨ -b^{102, 11}_0
c  in DIMACS:
-19463  19464 -19465  1020  19466 0
-19463  19464 -19465  1020  19467 0
-19463  19464 -19465  1020 -19468 0

c  -2-1 --> break 
c    ( b^{102, 10}_2 ∧  b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨  b^{102, 10}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-19463 -19464  19465  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 10}_2 ∧ -b^{102, 10}_1 ∧ -b^{102, 10}_0 ∧ true) 
c  in CNF:
c    -b^{102, 10}_2 ∨  b^{102, 10}_1 ∨  b^{102, 10}_0 ∨ false 
c  in DIMACS:
-19463  19464  19465  0

c  3 does not represent an automaton state.
c    -(-b^{102, 10}_2 ∧  b^{102, 10}_1 ∧  b^{102, 10}_0 ∧ true) 
c  in CNF:
c     b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ false 
c  in DIMACS:
 19463 -19464 -19465  0
c  -3 does not represent an automaton state.
c    -( b^{102, 10}_2 ∧  b^{102, 10}_1 ∧  b^{102, 10}_0 ∧ true) 
c  in CNF:
c    -b^{102, 10}_2 ∨ -b^{102, 10}_1 ∨ -b^{102, 10}_0 ∨ false 
c  in DIMACS:
-19463 -19464 -19465  0

c i = 11
c  -2+1 --> -1
c    ( b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧  p_1122) -> ( b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧  b^{102, 12}_0)
c  in CNF:
c    -b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨  b^{102, 12}_2
c    -b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_1
c    -b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨  b^{102, 12}_0
c  in DIMACS:
-19466 -19467  19468 -1122  19469 0
-19466 -19467  19468 -1122 -19470 0
-19466 -19467  19468 -1122  19471 0

c  -1+1 --> 0
c    ( b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0 ∧  p_1122) -> (-b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧ -b^{102, 12}_0)
c  in CNF:
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_2
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_1
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_0
c  in DIMACS:
-19466  19467 -19468 -1122 -19469 0
-19466  19467 -19468 -1122 -19470 0
-19466  19467 -19468 -1122 -19471 0

c  0+1 --> 1
c    (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧  p_1122) -> (-b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧  b^{102, 12}_0)
c  in CNF:
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_2
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_1
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨  b^{102, 12}_0
c  in DIMACS:
 19466  19467  19468 -1122 -19469 0
 19466  19467  19468 -1122 -19470 0
 19466  19467  19468 -1122  19471 0

c  1+1 --> 2
c    (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0 ∧  p_1122) -> (-b^{102, 12}_2 ∧  b^{102, 12}_1 ∧ -b^{102, 12}_0)
c  in CNF:
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_2
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨  b^{102, 12}_1
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ -p_1122 ∨ -b^{102, 12}_0
c  in DIMACS:
 19466  19467 -19468 -1122 -19469 0
 19466  19467 -19468 -1122  19470 0
 19466  19467 -19468 -1122 -19471 0

c  2+1 --> break 
c    (-b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 19466 -19467  19468 -1122 1162 0


c  2-1 --> 1
c    (-b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧ -p_1122) -> (-b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧  b^{102, 12}_0)
c  in CNF:
c     b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_2
c     b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_1
c     b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨  b^{102, 12}_0
c  in DIMACS:
 19466 -19467  19468  1122 -19469 0
 19466 -19467  19468  1122 -19470 0
 19466 -19467  19468  1122  19471 0

c  1-1 --> 0
c    (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0 ∧ -p_1122) -> (-b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧ -b^{102, 12}_0)
c  in CNF:
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_2
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_1
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_0
c  in DIMACS:
 19466  19467 -19468  1122 -19469 0
 19466  19467 -19468  1122 -19470 0
 19466  19467 -19468  1122 -19471 0

c  0-1 --> -1
c    (-b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧ -p_1122) -> ( b^{102, 12}_2 ∧ -b^{102, 12}_1 ∧  b^{102, 12}_0)
c  in CNF:
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨  b^{102, 12}_2
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_1
c     b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨  b^{102, 12}_0
c  in DIMACS:
 19466  19467  19468  1122  19469 0
 19466  19467  19468  1122 -19470 0
 19466  19467  19468  1122  19471 0

c  -1-1 --> -2
c    ( b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧  b^{102, 11}_0 ∧ -p_1122) -> ( b^{102, 12}_2 ∧  b^{102, 12}_1 ∧ -b^{102, 12}_0)
c  in CNF:
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨  b^{102, 12}_2
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨  b^{102, 12}_1
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨  p_1122 ∨ -b^{102, 12}_0
c  in DIMACS:
-19466  19467 -19468  1122  19469 0
-19466  19467 -19468  1122  19470 0
-19466  19467 -19468  1122 -19471 0

c  -2-1 --> break 
c    ( b^{102, 11}_2 ∧  b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨  b^{102, 11}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-19466 -19467  19468  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{102, 11}_2 ∧ -b^{102, 11}_1 ∧ -b^{102, 11}_0 ∧ true) 
c  in CNF:
c    -b^{102, 11}_2 ∨  b^{102, 11}_1 ∨  b^{102, 11}_0 ∨ false 
c  in DIMACS:
-19466  19467  19468  0

c  3 does not represent an automaton state.
c    -(-b^{102, 11}_2 ∧  b^{102, 11}_1 ∧  b^{102, 11}_0 ∧ true) 
c  in CNF:
c     b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ false 
c  in DIMACS:
 19466 -19467 -19468  0
c  -3 does not represent an automaton state.
c    -( b^{102, 11}_2 ∧  b^{102, 11}_1 ∧  b^{102, 11}_0 ∧ true) 
c  in CNF:
c    -b^{102, 11}_2 ∨ -b^{102, 11}_1 ∨ -b^{102, 11}_0 ∨ false 
c  in DIMACS:
-19466 -19467 -19468  0

c INIT for k = 103
c    -b^{103, 1}_2
c    -b^{103, 1}_1
c    -b^{103, 1}_0
c  in DIMACS:
-19472 0
-19473 0
-19474 0

c Transitions for k = 103
c i = 1
c  -2+1 --> -1
c    ( b^{103, 1}_2 ∧  b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧  p_103) -> ( b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0)
c  in CNF:
c    -b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨  b^{103, 2}_2
c    -b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_1
c    -b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨  b^{103, 2}_0
c  in DIMACS:
-19472 -19473  19474 -103  19475 0
-19472 -19473  19474 -103 -19476 0
-19472 -19473  19474 -103  19477 0

c  -1+1 --> 0
c    ( b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧  b^{103, 1}_0 ∧  p_103) -> (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧ -b^{103, 2}_0)
c  in CNF:
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_2
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_1
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_0
c  in DIMACS:
-19472  19473 -19474 -103 -19475 0
-19472  19473 -19474 -103 -19476 0
-19472  19473 -19474 -103 -19477 0

c  0+1 --> 1
c    (-b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧  p_103) -> (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0)
c  in CNF:
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_2
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_1
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨  b^{103, 2}_0
c  in DIMACS:
 19472  19473  19474 -103 -19475 0
 19472  19473  19474 -103 -19476 0
 19472  19473  19474 -103  19477 0

c  1+1 --> 2
c    (-b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧  b^{103, 1}_0 ∧  p_103) -> (-b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0)
c  in CNF:
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_2
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨  b^{103, 2}_1
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ -p_103 ∨ -b^{103, 2}_0
c  in DIMACS:
 19472  19473 -19474 -103 -19475 0
 19472  19473 -19474 -103  19476 0
 19472  19473 -19474 -103 -19477 0

c  2+1 --> break 
c    (-b^{103, 1}_2 ∧  b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧  p_103) -> break
c  in CNF:
c     b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ -p_103 ∨ break
c  in DIMACS:
 19472 -19473  19474 -103 1162 0


c  2-1 --> 1
c    (-b^{103, 1}_2 ∧  b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧ -p_103) -> (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0)
c  in CNF:
c     b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_2
c     b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_1
c     b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨  b^{103, 2}_0
c  in DIMACS:
 19472 -19473  19474  103 -19475 0
 19472 -19473  19474  103 -19476 0
 19472 -19473  19474  103  19477 0

c  1-1 --> 0
c    (-b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧  b^{103, 1}_0 ∧ -p_103) -> (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧ -b^{103, 2}_0)
c  in CNF:
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_2
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_1
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_0
c  in DIMACS:
 19472  19473 -19474  103 -19475 0
 19472  19473 -19474  103 -19476 0
 19472  19473 -19474  103 -19477 0

c  0-1 --> -1
c    (-b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧ -p_103) -> ( b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0)
c  in CNF:
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨  b^{103, 2}_2
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_1
c     b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨  b^{103, 2}_0
c  in DIMACS:
 19472  19473  19474  103  19475 0
 19472  19473  19474  103 -19476 0
 19472  19473  19474  103  19477 0

c  -1-1 --> -2
c    ( b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧  b^{103, 1}_0 ∧ -p_103) -> ( b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0)
c  in CNF:
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨  b^{103, 2}_2
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨  b^{103, 2}_1
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨  p_103 ∨ -b^{103, 2}_0
c  in DIMACS:
-19472  19473 -19474  103  19475 0
-19472  19473 -19474  103  19476 0
-19472  19473 -19474  103 -19477 0

c  -2-1 --> break 
c    ( b^{103, 1}_2 ∧  b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧ -p_103) -> break
c  in CNF:
c    -b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨  b^{103, 1}_0 ∨  p_103 ∨ break
c  in DIMACS:
-19472 -19473  19474  103 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 1}_2 ∧ -b^{103, 1}_1 ∧ -b^{103, 1}_0 ∧ true) 
c  in CNF:
c    -b^{103, 1}_2 ∨  b^{103, 1}_1 ∨  b^{103, 1}_0 ∨ false 
c  in DIMACS:
-19472  19473  19474  0

c  3 does not represent an automaton state.
c    -(-b^{103, 1}_2 ∧  b^{103, 1}_1 ∧  b^{103, 1}_0 ∧ true) 
c  in CNF:
c     b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ false 
c  in DIMACS:
 19472 -19473 -19474  0
c  -3 does not represent an automaton state.
c    -( b^{103, 1}_2 ∧  b^{103, 1}_1 ∧  b^{103, 1}_0 ∧ true) 
c  in CNF:
c    -b^{103, 1}_2 ∨ -b^{103, 1}_1 ∨ -b^{103, 1}_0 ∨ false 
c  in DIMACS:
-19472 -19473 -19474  0

c i = 2
c  -2+1 --> -1
c    ( b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧  p_206) -> ( b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0)
c  in CNF:
c    -b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨  b^{103, 3}_2
c    -b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_1
c    -b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨  b^{103, 3}_0
c  in DIMACS:
-19475 -19476  19477 -206  19478 0
-19475 -19476  19477 -206 -19479 0
-19475 -19476  19477 -206  19480 0

c  -1+1 --> 0
c    ( b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0 ∧  p_206) -> (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧ -b^{103, 3}_0)
c  in CNF:
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_2
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_1
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_0
c  in DIMACS:
-19475  19476 -19477 -206 -19478 0
-19475  19476 -19477 -206 -19479 0
-19475  19476 -19477 -206 -19480 0

c  0+1 --> 1
c    (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧  p_206) -> (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0)
c  in CNF:
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_2
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_1
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨  b^{103, 3}_0
c  in DIMACS:
 19475  19476  19477 -206 -19478 0
 19475  19476  19477 -206 -19479 0
 19475  19476  19477 -206  19480 0

c  1+1 --> 2
c    (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0 ∧  p_206) -> (-b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0)
c  in CNF:
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_2
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨  b^{103, 3}_1
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ -p_206 ∨ -b^{103, 3}_0
c  in DIMACS:
 19475  19476 -19477 -206 -19478 0
 19475  19476 -19477 -206  19479 0
 19475  19476 -19477 -206 -19480 0

c  2+1 --> break 
c    (-b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧  p_206) -> break
c  in CNF:
c     b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ -p_206 ∨ break
c  in DIMACS:
 19475 -19476  19477 -206 1162 0


c  2-1 --> 1
c    (-b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧ -p_206) -> (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0)
c  in CNF:
c     b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_2
c     b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_1
c     b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨  b^{103, 3}_0
c  in DIMACS:
 19475 -19476  19477  206 -19478 0
 19475 -19476  19477  206 -19479 0
 19475 -19476  19477  206  19480 0

c  1-1 --> 0
c    (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0 ∧ -p_206) -> (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧ -b^{103, 3}_0)
c  in CNF:
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_2
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_1
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_0
c  in DIMACS:
 19475  19476 -19477  206 -19478 0
 19475  19476 -19477  206 -19479 0
 19475  19476 -19477  206 -19480 0

c  0-1 --> -1
c    (-b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧ -p_206) -> ( b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0)
c  in CNF:
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨  b^{103, 3}_2
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_1
c     b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨  b^{103, 3}_0
c  in DIMACS:
 19475  19476  19477  206  19478 0
 19475  19476  19477  206 -19479 0
 19475  19476  19477  206  19480 0

c  -1-1 --> -2
c    ( b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧  b^{103, 2}_0 ∧ -p_206) -> ( b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0)
c  in CNF:
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨  b^{103, 3}_2
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨  b^{103, 3}_1
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨  p_206 ∨ -b^{103, 3}_0
c  in DIMACS:
-19475  19476 -19477  206  19478 0
-19475  19476 -19477  206  19479 0
-19475  19476 -19477  206 -19480 0

c  -2-1 --> break 
c    ( b^{103, 2}_2 ∧  b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧ -p_206) -> break
c  in CNF:
c    -b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨  b^{103, 2}_0 ∨  p_206 ∨ break
c  in DIMACS:
-19475 -19476  19477  206 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 2}_2 ∧ -b^{103, 2}_1 ∧ -b^{103, 2}_0 ∧ true) 
c  in CNF:
c    -b^{103, 2}_2 ∨  b^{103, 2}_1 ∨  b^{103, 2}_0 ∨ false 
c  in DIMACS:
-19475  19476  19477  0

c  3 does not represent an automaton state.
c    -(-b^{103, 2}_2 ∧  b^{103, 2}_1 ∧  b^{103, 2}_0 ∧ true) 
c  in CNF:
c     b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ false 
c  in DIMACS:
 19475 -19476 -19477  0
c  -3 does not represent an automaton state.
c    -( b^{103, 2}_2 ∧  b^{103, 2}_1 ∧  b^{103, 2}_0 ∧ true) 
c  in CNF:
c    -b^{103, 2}_2 ∨ -b^{103, 2}_1 ∨ -b^{103, 2}_0 ∨ false 
c  in DIMACS:
-19475 -19476 -19477  0

c i = 3
c  -2+1 --> -1
c    ( b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧  p_309) -> ( b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0)
c  in CNF:
c    -b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨  b^{103, 4}_2
c    -b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_1
c    -b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨  b^{103, 4}_0
c  in DIMACS:
-19478 -19479  19480 -309  19481 0
-19478 -19479  19480 -309 -19482 0
-19478 -19479  19480 -309  19483 0

c  -1+1 --> 0
c    ( b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0 ∧  p_309) -> (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧ -b^{103, 4}_0)
c  in CNF:
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_2
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_1
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_0
c  in DIMACS:
-19478  19479 -19480 -309 -19481 0
-19478  19479 -19480 -309 -19482 0
-19478  19479 -19480 -309 -19483 0

c  0+1 --> 1
c    (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧  p_309) -> (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0)
c  in CNF:
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_2
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_1
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨  b^{103, 4}_0
c  in DIMACS:
 19478  19479  19480 -309 -19481 0
 19478  19479  19480 -309 -19482 0
 19478  19479  19480 -309  19483 0

c  1+1 --> 2
c    (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0 ∧  p_309) -> (-b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0)
c  in CNF:
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_2
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨  b^{103, 4}_1
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ -p_309 ∨ -b^{103, 4}_0
c  in DIMACS:
 19478  19479 -19480 -309 -19481 0
 19478  19479 -19480 -309  19482 0
 19478  19479 -19480 -309 -19483 0

c  2+1 --> break 
c    (-b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧  p_309) -> break
c  in CNF:
c     b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ -p_309 ∨ break
c  in DIMACS:
 19478 -19479  19480 -309 1162 0


c  2-1 --> 1
c    (-b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧ -p_309) -> (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0)
c  in CNF:
c     b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_2
c     b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_1
c     b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨  b^{103, 4}_0
c  in DIMACS:
 19478 -19479  19480  309 -19481 0
 19478 -19479  19480  309 -19482 0
 19478 -19479  19480  309  19483 0

c  1-1 --> 0
c    (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0 ∧ -p_309) -> (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧ -b^{103, 4}_0)
c  in CNF:
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_2
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_1
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_0
c  in DIMACS:
 19478  19479 -19480  309 -19481 0
 19478  19479 -19480  309 -19482 0
 19478  19479 -19480  309 -19483 0

c  0-1 --> -1
c    (-b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧ -p_309) -> ( b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0)
c  in CNF:
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨  b^{103, 4}_2
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_1
c     b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨  b^{103, 4}_0
c  in DIMACS:
 19478  19479  19480  309  19481 0
 19478  19479  19480  309 -19482 0
 19478  19479  19480  309  19483 0

c  -1-1 --> -2
c    ( b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧  b^{103, 3}_0 ∧ -p_309) -> ( b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0)
c  in CNF:
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨  b^{103, 4}_2
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨  b^{103, 4}_1
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨  p_309 ∨ -b^{103, 4}_0
c  in DIMACS:
-19478  19479 -19480  309  19481 0
-19478  19479 -19480  309  19482 0
-19478  19479 -19480  309 -19483 0

c  -2-1 --> break 
c    ( b^{103, 3}_2 ∧  b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧ -p_309) -> break
c  in CNF:
c    -b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨  b^{103, 3}_0 ∨  p_309 ∨ break
c  in DIMACS:
-19478 -19479  19480  309 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 3}_2 ∧ -b^{103, 3}_1 ∧ -b^{103, 3}_0 ∧ true) 
c  in CNF:
c    -b^{103, 3}_2 ∨  b^{103, 3}_1 ∨  b^{103, 3}_0 ∨ false 
c  in DIMACS:
-19478  19479  19480  0

c  3 does not represent an automaton state.
c    -(-b^{103, 3}_2 ∧  b^{103, 3}_1 ∧  b^{103, 3}_0 ∧ true) 
c  in CNF:
c     b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ false 
c  in DIMACS:
 19478 -19479 -19480  0
c  -3 does not represent an automaton state.
c    -( b^{103, 3}_2 ∧  b^{103, 3}_1 ∧  b^{103, 3}_0 ∧ true) 
c  in CNF:
c    -b^{103, 3}_2 ∨ -b^{103, 3}_1 ∨ -b^{103, 3}_0 ∨ false 
c  in DIMACS:
-19478 -19479 -19480  0

c i = 4
c  -2+1 --> -1
c    ( b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧  p_412) -> ( b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0)
c  in CNF:
c    -b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨  b^{103, 5}_2
c    -b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_1
c    -b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨  b^{103, 5}_0
c  in DIMACS:
-19481 -19482  19483 -412  19484 0
-19481 -19482  19483 -412 -19485 0
-19481 -19482  19483 -412  19486 0

c  -1+1 --> 0
c    ( b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0 ∧  p_412) -> (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧ -b^{103, 5}_0)
c  in CNF:
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_2
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_1
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_0
c  in DIMACS:
-19481  19482 -19483 -412 -19484 0
-19481  19482 -19483 -412 -19485 0
-19481  19482 -19483 -412 -19486 0

c  0+1 --> 1
c    (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧  p_412) -> (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0)
c  in CNF:
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_2
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_1
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨  b^{103, 5}_0
c  in DIMACS:
 19481  19482  19483 -412 -19484 0
 19481  19482  19483 -412 -19485 0
 19481  19482  19483 -412  19486 0

c  1+1 --> 2
c    (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0 ∧  p_412) -> (-b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0)
c  in CNF:
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_2
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨  b^{103, 5}_1
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ -p_412 ∨ -b^{103, 5}_0
c  in DIMACS:
 19481  19482 -19483 -412 -19484 0
 19481  19482 -19483 -412  19485 0
 19481  19482 -19483 -412 -19486 0

c  2+1 --> break 
c    (-b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧  p_412) -> break
c  in CNF:
c     b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ -p_412 ∨ break
c  in DIMACS:
 19481 -19482  19483 -412 1162 0


c  2-1 --> 1
c    (-b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧ -p_412) -> (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0)
c  in CNF:
c     b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_2
c     b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_1
c     b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨  b^{103, 5}_0
c  in DIMACS:
 19481 -19482  19483  412 -19484 0
 19481 -19482  19483  412 -19485 0
 19481 -19482  19483  412  19486 0

c  1-1 --> 0
c    (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0 ∧ -p_412) -> (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧ -b^{103, 5}_0)
c  in CNF:
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_2
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_1
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_0
c  in DIMACS:
 19481  19482 -19483  412 -19484 0
 19481  19482 -19483  412 -19485 0
 19481  19482 -19483  412 -19486 0

c  0-1 --> -1
c    (-b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧ -p_412) -> ( b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0)
c  in CNF:
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨  b^{103, 5}_2
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_1
c     b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨  b^{103, 5}_0
c  in DIMACS:
 19481  19482  19483  412  19484 0
 19481  19482  19483  412 -19485 0
 19481  19482  19483  412  19486 0

c  -1-1 --> -2
c    ( b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧  b^{103, 4}_0 ∧ -p_412) -> ( b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0)
c  in CNF:
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨  b^{103, 5}_2
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨  b^{103, 5}_1
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨  p_412 ∨ -b^{103, 5}_0
c  in DIMACS:
-19481  19482 -19483  412  19484 0
-19481  19482 -19483  412  19485 0
-19481  19482 -19483  412 -19486 0

c  -2-1 --> break 
c    ( b^{103, 4}_2 ∧  b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧ -p_412) -> break
c  in CNF:
c    -b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨  b^{103, 4}_0 ∨  p_412 ∨ break
c  in DIMACS:
-19481 -19482  19483  412 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 4}_2 ∧ -b^{103, 4}_1 ∧ -b^{103, 4}_0 ∧ true) 
c  in CNF:
c    -b^{103, 4}_2 ∨  b^{103, 4}_1 ∨  b^{103, 4}_0 ∨ false 
c  in DIMACS:
-19481  19482  19483  0

c  3 does not represent an automaton state.
c    -(-b^{103, 4}_2 ∧  b^{103, 4}_1 ∧  b^{103, 4}_0 ∧ true) 
c  in CNF:
c     b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ false 
c  in DIMACS:
 19481 -19482 -19483  0
c  -3 does not represent an automaton state.
c    -( b^{103, 4}_2 ∧  b^{103, 4}_1 ∧  b^{103, 4}_0 ∧ true) 
c  in CNF:
c    -b^{103, 4}_2 ∨ -b^{103, 4}_1 ∨ -b^{103, 4}_0 ∨ false 
c  in DIMACS:
-19481 -19482 -19483  0

c i = 5
c  -2+1 --> -1
c    ( b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧  p_515) -> ( b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0)
c  in CNF:
c    -b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨  b^{103, 6}_2
c    -b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_1
c    -b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨  b^{103, 6}_0
c  in DIMACS:
-19484 -19485  19486 -515  19487 0
-19484 -19485  19486 -515 -19488 0
-19484 -19485  19486 -515  19489 0

c  -1+1 --> 0
c    ( b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0 ∧  p_515) -> (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧ -b^{103, 6}_0)
c  in CNF:
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_2
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_1
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_0
c  in DIMACS:
-19484  19485 -19486 -515 -19487 0
-19484  19485 -19486 -515 -19488 0
-19484  19485 -19486 -515 -19489 0

c  0+1 --> 1
c    (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧  p_515) -> (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0)
c  in CNF:
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_2
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_1
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨  b^{103, 6}_0
c  in DIMACS:
 19484  19485  19486 -515 -19487 0
 19484  19485  19486 -515 -19488 0
 19484  19485  19486 -515  19489 0

c  1+1 --> 2
c    (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0 ∧  p_515) -> (-b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0)
c  in CNF:
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_2
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨  b^{103, 6}_1
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ -p_515 ∨ -b^{103, 6}_0
c  in DIMACS:
 19484  19485 -19486 -515 -19487 0
 19484  19485 -19486 -515  19488 0
 19484  19485 -19486 -515 -19489 0

c  2+1 --> break 
c    (-b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧  p_515) -> break
c  in CNF:
c     b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ -p_515 ∨ break
c  in DIMACS:
 19484 -19485  19486 -515 1162 0


c  2-1 --> 1
c    (-b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧ -p_515) -> (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0)
c  in CNF:
c     b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_2
c     b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_1
c     b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨  b^{103, 6}_0
c  in DIMACS:
 19484 -19485  19486  515 -19487 0
 19484 -19485  19486  515 -19488 0
 19484 -19485  19486  515  19489 0

c  1-1 --> 0
c    (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0 ∧ -p_515) -> (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧ -b^{103, 6}_0)
c  in CNF:
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_2
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_1
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_0
c  in DIMACS:
 19484  19485 -19486  515 -19487 0
 19484  19485 -19486  515 -19488 0
 19484  19485 -19486  515 -19489 0

c  0-1 --> -1
c    (-b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧ -p_515) -> ( b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0)
c  in CNF:
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨  b^{103, 6}_2
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_1
c     b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨  b^{103, 6}_0
c  in DIMACS:
 19484  19485  19486  515  19487 0
 19484  19485  19486  515 -19488 0
 19484  19485  19486  515  19489 0

c  -1-1 --> -2
c    ( b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧  b^{103, 5}_0 ∧ -p_515) -> ( b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0)
c  in CNF:
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨  b^{103, 6}_2
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨  b^{103, 6}_1
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨  p_515 ∨ -b^{103, 6}_0
c  in DIMACS:
-19484  19485 -19486  515  19487 0
-19484  19485 -19486  515  19488 0
-19484  19485 -19486  515 -19489 0

c  -2-1 --> break 
c    ( b^{103, 5}_2 ∧  b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧ -p_515) -> break
c  in CNF:
c    -b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨  b^{103, 5}_0 ∨  p_515 ∨ break
c  in DIMACS:
-19484 -19485  19486  515 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 5}_2 ∧ -b^{103, 5}_1 ∧ -b^{103, 5}_0 ∧ true) 
c  in CNF:
c    -b^{103, 5}_2 ∨  b^{103, 5}_1 ∨  b^{103, 5}_0 ∨ false 
c  in DIMACS:
-19484  19485  19486  0

c  3 does not represent an automaton state.
c    -(-b^{103, 5}_2 ∧  b^{103, 5}_1 ∧  b^{103, 5}_0 ∧ true) 
c  in CNF:
c     b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ false 
c  in DIMACS:
 19484 -19485 -19486  0
c  -3 does not represent an automaton state.
c    -( b^{103, 5}_2 ∧  b^{103, 5}_1 ∧  b^{103, 5}_0 ∧ true) 
c  in CNF:
c    -b^{103, 5}_2 ∨ -b^{103, 5}_1 ∨ -b^{103, 5}_0 ∨ false 
c  in DIMACS:
-19484 -19485 -19486  0

c i = 6
c  -2+1 --> -1
c    ( b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧  p_618) -> ( b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0)
c  in CNF:
c    -b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨  b^{103, 7}_2
c    -b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_1
c    -b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨  b^{103, 7}_0
c  in DIMACS:
-19487 -19488  19489 -618  19490 0
-19487 -19488  19489 -618 -19491 0
-19487 -19488  19489 -618  19492 0

c  -1+1 --> 0
c    ( b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0 ∧  p_618) -> (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧ -b^{103, 7}_0)
c  in CNF:
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_2
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_1
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_0
c  in DIMACS:
-19487  19488 -19489 -618 -19490 0
-19487  19488 -19489 -618 -19491 0
-19487  19488 -19489 -618 -19492 0

c  0+1 --> 1
c    (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧  p_618) -> (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0)
c  in CNF:
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_2
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_1
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨  b^{103, 7}_0
c  in DIMACS:
 19487  19488  19489 -618 -19490 0
 19487  19488  19489 -618 -19491 0
 19487  19488  19489 -618  19492 0

c  1+1 --> 2
c    (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0 ∧  p_618) -> (-b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0)
c  in CNF:
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_2
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨  b^{103, 7}_1
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ -p_618 ∨ -b^{103, 7}_0
c  in DIMACS:
 19487  19488 -19489 -618 -19490 0
 19487  19488 -19489 -618  19491 0
 19487  19488 -19489 -618 -19492 0

c  2+1 --> break 
c    (-b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧  p_618) -> break
c  in CNF:
c     b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 19487 -19488  19489 -618 1162 0


c  2-1 --> 1
c    (-b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧ -p_618) -> (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0)
c  in CNF:
c     b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_2
c     b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_1
c     b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨  b^{103, 7}_0
c  in DIMACS:
 19487 -19488  19489  618 -19490 0
 19487 -19488  19489  618 -19491 0
 19487 -19488  19489  618  19492 0

c  1-1 --> 0
c    (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0 ∧ -p_618) -> (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧ -b^{103, 7}_0)
c  in CNF:
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_2
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_1
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_0
c  in DIMACS:
 19487  19488 -19489  618 -19490 0
 19487  19488 -19489  618 -19491 0
 19487  19488 -19489  618 -19492 0

c  0-1 --> -1
c    (-b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧ -p_618) -> ( b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0)
c  in CNF:
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨  b^{103, 7}_2
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_1
c     b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨  b^{103, 7}_0
c  in DIMACS:
 19487  19488  19489  618  19490 0
 19487  19488  19489  618 -19491 0
 19487  19488  19489  618  19492 0

c  -1-1 --> -2
c    ( b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧  b^{103, 6}_0 ∧ -p_618) -> ( b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0)
c  in CNF:
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨  b^{103, 7}_2
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨  b^{103, 7}_1
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨  p_618 ∨ -b^{103, 7}_0
c  in DIMACS:
-19487  19488 -19489  618  19490 0
-19487  19488 -19489  618  19491 0
-19487  19488 -19489  618 -19492 0

c  -2-1 --> break 
c    ( b^{103, 6}_2 ∧  b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨  b^{103, 6}_0 ∨  p_618 ∨ break
c  in DIMACS:
-19487 -19488  19489  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 6}_2 ∧ -b^{103, 6}_1 ∧ -b^{103, 6}_0 ∧ true) 
c  in CNF:
c    -b^{103, 6}_2 ∨  b^{103, 6}_1 ∨  b^{103, 6}_0 ∨ false 
c  in DIMACS:
-19487  19488  19489  0

c  3 does not represent an automaton state.
c    -(-b^{103, 6}_2 ∧  b^{103, 6}_1 ∧  b^{103, 6}_0 ∧ true) 
c  in CNF:
c     b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ false 
c  in DIMACS:
 19487 -19488 -19489  0
c  -3 does not represent an automaton state.
c    -( b^{103, 6}_2 ∧  b^{103, 6}_1 ∧  b^{103, 6}_0 ∧ true) 
c  in CNF:
c    -b^{103, 6}_2 ∨ -b^{103, 6}_1 ∨ -b^{103, 6}_0 ∨ false 
c  in DIMACS:
-19487 -19488 -19489  0

c i = 7
c  -2+1 --> -1
c    ( b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧  p_721) -> ( b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0)
c  in CNF:
c    -b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨  b^{103, 8}_2
c    -b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_1
c    -b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨  b^{103, 8}_0
c  in DIMACS:
-19490 -19491  19492 -721  19493 0
-19490 -19491  19492 -721 -19494 0
-19490 -19491  19492 -721  19495 0

c  -1+1 --> 0
c    ( b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0 ∧  p_721) -> (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧ -b^{103, 8}_0)
c  in CNF:
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_2
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_1
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_0
c  in DIMACS:
-19490  19491 -19492 -721 -19493 0
-19490  19491 -19492 -721 -19494 0
-19490  19491 -19492 -721 -19495 0

c  0+1 --> 1
c    (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧  p_721) -> (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0)
c  in CNF:
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_2
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_1
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨  b^{103, 8}_0
c  in DIMACS:
 19490  19491  19492 -721 -19493 0
 19490  19491  19492 -721 -19494 0
 19490  19491  19492 -721  19495 0

c  1+1 --> 2
c    (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0 ∧  p_721) -> (-b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0)
c  in CNF:
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_2
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨  b^{103, 8}_1
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ -p_721 ∨ -b^{103, 8}_0
c  in DIMACS:
 19490  19491 -19492 -721 -19493 0
 19490  19491 -19492 -721  19494 0
 19490  19491 -19492 -721 -19495 0

c  2+1 --> break 
c    (-b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧  p_721) -> break
c  in CNF:
c     b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ -p_721 ∨ break
c  in DIMACS:
 19490 -19491  19492 -721 1162 0


c  2-1 --> 1
c    (-b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧ -p_721) -> (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0)
c  in CNF:
c     b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_2
c     b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_1
c     b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨  b^{103, 8}_0
c  in DIMACS:
 19490 -19491  19492  721 -19493 0
 19490 -19491  19492  721 -19494 0
 19490 -19491  19492  721  19495 0

c  1-1 --> 0
c    (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0 ∧ -p_721) -> (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧ -b^{103, 8}_0)
c  in CNF:
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_2
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_1
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_0
c  in DIMACS:
 19490  19491 -19492  721 -19493 0
 19490  19491 -19492  721 -19494 0
 19490  19491 -19492  721 -19495 0

c  0-1 --> -1
c    (-b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧ -p_721) -> ( b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0)
c  in CNF:
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨  b^{103, 8}_2
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_1
c     b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨  b^{103, 8}_0
c  in DIMACS:
 19490  19491  19492  721  19493 0
 19490  19491  19492  721 -19494 0
 19490  19491  19492  721  19495 0

c  -1-1 --> -2
c    ( b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧  b^{103, 7}_0 ∧ -p_721) -> ( b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0)
c  in CNF:
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨  b^{103, 8}_2
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨  b^{103, 8}_1
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨  p_721 ∨ -b^{103, 8}_0
c  in DIMACS:
-19490  19491 -19492  721  19493 0
-19490  19491 -19492  721  19494 0
-19490  19491 -19492  721 -19495 0

c  -2-1 --> break 
c    ( b^{103, 7}_2 ∧  b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧ -p_721) -> break
c  in CNF:
c    -b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨  b^{103, 7}_0 ∨  p_721 ∨ break
c  in DIMACS:
-19490 -19491  19492  721 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 7}_2 ∧ -b^{103, 7}_1 ∧ -b^{103, 7}_0 ∧ true) 
c  in CNF:
c    -b^{103, 7}_2 ∨  b^{103, 7}_1 ∨  b^{103, 7}_0 ∨ false 
c  in DIMACS:
-19490  19491  19492  0

c  3 does not represent an automaton state.
c    -(-b^{103, 7}_2 ∧  b^{103, 7}_1 ∧  b^{103, 7}_0 ∧ true) 
c  in CNF:
c     b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ false 
c  in DIMACS:
 19490 -19491 -19492  0
c  -3 does not represent an automaton state.
c    -( b^{103, 7}_2 ∧  b^{103, 7}_1 ∧  b^{103, 7}_0 ∧ true) 
c  in CNF:
c    -b^{103, 7}_2 ∨ -b^{103, 7}_1 ∨ -b^{103, 7}_0 ∨ false 
c  in DIMACS:
-19490 -19491 -19492  0

c i = 8
c  -2+1 --> -1
c    ( b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧  p_824) -> ( b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0)
c  in CNF:
c    -b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨  b^{103, 9}_2
c    -b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_1
c    -b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨  b^{103, 9}_0
c  in DIMACS:
-19493 -19494  19495 -824  19496 0
-19493 -19494  19495 -824 -19497 0
-19493 -19494  19495 -824  19498 0

c  -1+1 --> 0
c    ( b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0 ∧  p_824) -> (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧ -b^{103, 9}_0)
c  in CNF:
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_2
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_1
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_0
c  in DIMACS:
-19493  19494 -19495 -824 -19496 0
-19493  19494 -19495 -824 -19497 0
-19493  19494 -19495 -824 -19498 0

c  0+1 --> 1
c    (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧  p_824) -> (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0)
c  in CNF:
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_2
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_1
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨  b^{103, 9}_0
c  in DIMACS:
 19493  19494  19495 -824 -19496 0
 19493  19494  19495 -824 -19497 0
 19493  19494  19495 -824  19498 0

c  1+1 --> 2
c    (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0 ∧  p_824) -> (-b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0)
c  in CNF:
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_2
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨  b^{103, 9}_1
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ -p_824 ∨ -b^{103, 9}_0
c  in DIMACS:
 19493  19494 -19495 -824 -19496 0
 19493  19494 -19495 -824  19497 0
 19493  19494 -19495 -824 -19498 0

c  2+1 --> break 
c    (-b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧  p_824) -> break
c  in CNF:
c     b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 19493 -19494  19495 -824 1162 0


c  2-1 --> 1
c    (-b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧ -p_824) -> (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0)
c  in CNF:
c     b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_2
c     b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_1
c     b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨  b^{103, 9}_0
c  in DIMACS:
 19493 -19494  19495  824 -19496 0
 19493 -19494  19495  824 -19497 0
 19493 -19494  19495  824  19498 0

c  1-1 --> 0
c    (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0 ∧ -p_824) -> (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧ -b^{103, 9}_0)
c  in CNF:
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_2
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_1
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_0
c  in DIMACS:
 19493  19494 -19495  824 -19496 0
 19493  19494 -19495  824 -19497 0
 19493  19494 -19495  824 -19498 0

c  0-1 --> -1
c    (-b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧ -p_824) -> ( b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0)
c  in CNF:
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨  b^{103, 9}_2
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_1
c     b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨  b^{103, 9}_0
c  in DIMACS:
 19493  19494  19495  824  19496 0
 19493  19494  19495  824 -19497 0
 19493  19494  19495  824  19498 0

c  -1-1 --> -2
c    ( b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧  b^{103, 8}_0 ∧ -p_824) -> ( b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0)
c  in CNF:
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨  b^{103, 9}_2
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨  b^{103, 9}_1
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨  p_824 ∨ -b^{103, 9}_0
c  in DIMACS:
-19493  19494 -19495  824  19496 0
-19493  19494 -19495  824  19497 0
-19493  19494 -19495  824 -19498 0

c  -2-1 --> break 
c    ( b^{103, 8}_2 ∧  b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨  b^{103, 8}_0 ∨  p_824 ∨ break
c  in DIMACS:
-19493 -19494  19495  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 8}_2 ∧ -b^{103, 8}_1 ∧ -b^{103, 8}_0 ∧ true) 
c  in CNF:
c    -b^{103, 8}_2 ∨  b^{103, 8}_1 ∨  b^{103, 8}_0 ∨ false 
c  in DIMACS:
-19493  19494  19495  0

c  3 does not represent an automaton state.
c    -(-b^{103, 8}_2 ∧  b^{103, 8}_1 ∧  b^{103, 8}_0 ∧ true) 
c  in CNF:
c     b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ false 
c  in DIMACS:
 19493 -19494 -19495  0
c  -3 does not represent an automaton state.
c    -( b^{103, 8}_2 ∧  b^{103, 8}_1 ∧  b^{103, 8}_0 ∧ true) 
c  in CNF:
c    -b^{103, 8}_2 ∨ -b^{103, 8}_1 ∨ -b^{103, 8}_0 ∨ false 
c  in DIMACS:
-19493 -19494 -19495  0

c i = 9
c  -2+1 --> -1
c    ( b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧  p_927) -> ( b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0)
c  in CNF:
c    -b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨  b^{103, 10}_2
c    -b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_1
c    -b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨  b^{103, 10}_0
c  in DIMACS:
-19496 -19497  19498 -927  19499 0
-19496 -19497  19498 -927 -19500 0
-19496 -19497  19498 -927  19501 0

c  -1+1 --> 0
c    ( b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0 ∧  p_927) -> (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧ -b^{103, 10}_0)
c  in CNF:
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_2
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_1
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_0
c  in DIMACS:
-19496  19497 -19498 -927 -19499 0
-19496  19497 -19498 -927 -19500 0
-19496  19497 -19498 -927 -19501 0

c  0+1 --> 1
c    (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧  p_927) -> (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0)
c  in CNF:
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_2
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_1
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨  b^{103, 10}_0
c  in DIMACS:
 19496  19497  19498 -927 -19499 0
 19496  19497  19498 -927 -19500 0
 19496  19497  19498 -927  19501 0

c  1+1 --> 2
c    (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0 ∧  p_927) -> (-b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0)
c  in CNF:
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_2
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨  b^{103, 10}_1
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ -p_927 ∨ -b^{103, 10}_0
c  in DIMACS:
 19496  19497 -19498 -927 -19499 0
 19496  19497 -19498 -927  19500 0
 19496  19497 -19498 -927 -19501 0

c  2+1 --> break 
c    (-b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧  p_927) -> break
c  in CNF:
c     b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ -p_927 ∨ break
c  in DIMACS:
 19496 -19497  19498 -927 1162 0


c  2-1 --> 1
c    (-b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧ -p_927) -> (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0)
c  in CNF:
c     b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_2
c     b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_1
c     b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨  b^{103, 10}_0
c  in DIMACS:
 19496 -19497  19498  927 -19499 0
 19496 -19497  19498  927 -19500 0
 19496 -19497  19498  927  19501 0

c  1-1 --> 0
c    (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0 ∧ -p_927) -> (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧ -b^{103, 10}_0)
c  in CNF:
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_2
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_1
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_0
c  in DIMACS:
 19496  19497 -19498  927 -19499 0
 19496  19497 -19498  927 -19500 0
 19496  19497 -19498  927 -19501 0

c  0-1 --> -1
c    (-b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧ -p_927) -> ( b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0)
c  in CNF:
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨  b^{103, 10}_2
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_1
c     b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨  b^{103, 10}_0
c  in DIMACS:
 19496  19497  19498  927  19499 0
 19496  19497  19498  927 -19500 0
 19496  19497  19498  927  19501 0

c  -1-1 --> -2
c    ( b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧  b^{103, 9}_0 ∧ -p_927) -> ( b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0)
c  in CNF:
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨  b^{103, 10}_2
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨  b^{103, 10}_1
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨  p_927 ∨ -b^{103, 10}_0
c  in DIMACS:
-19496  19497 -19498  927  19499 0
-19496  19497 -19498  927  19500 0
-19496  19497 -19498  927 -19501 0

c  -2-1 --> break 
c    ( b^{103, 9}_2 ∧  b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧ -p_927) -> break
c  in CNF:
c    -b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨  b^{103, 9}_0 ∨  p_927 ∨ break
c  in DIMACS:
-19496 -19497  19498  927 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 9}_2 ∧ -b^{103, 9}_1 ∧ -b^{103, 9}_0 ∧ true) 
c  in CNF:
c    -b^{103, 9}_2 ∨  b^{103, 9}_1 ∨  b^{103, 9}_0 ∨ false 
c  in DIMACS:
-19496  19497  19498  0

c  3 does not represent an automaton state.
c    -(-b^{103, 9}_2 ∧  b^{103, 9}_1 ∧  b^{103, 9}_0 ∧ true) 
c  in CNF:
c     b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ false 
c  in DIMACS:
 19496 -19497 -19498  0
c  -3 does not represent an automaton state.
c    -( b^{103, 9}_2 ∧  b^{103, 9}_1 ∧  b^{103, 9}_0 ∧ true) 
c  in CNF:
c    -b^{103, 9}_2 ∨ -b^{103, 9}_1 ∨ -b^{103, 9}_0 ∨ false 
c  in DIMACS:
-19496 -19497 -19498  0

c i = 10
c  -2+1 --> -1
c    ( b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧  p_1030) -> ( b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0)
c  in CNF:
c    -b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨  b^{103, 11}_2
c    -b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_1
c    -b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨  b^{103, 11}_0
c  in DIMACS:
-19499 -19500  19501 -1030  19502 0
-19499 -19500  19501 -1030 -19503 0
-19499 -19500  19501 -1030  19504 0

c  -1+1 --> 0
c    ( b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0 ∧  p_1030) -> (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧ -b^{103, 11}_0)
c  in CNF:
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_2
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_1
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_0
c  in DIMACS:
-19499  19500 -19501 -1030 -19502 0
-19499  19500 -19501 -1030 -19503 0
-19499  19500 -19501 -1030 -19504 0

c  0+1 --> 1
c    (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧  p_1030) -> (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0)
c  in CNF:
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_2
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_1
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨  b^{103, 11}_0
c  in DIMACS:
 19499  19500  19501 -1030 -19502 0
 19499  19500  19501 -1030 -19503 0
 19499  19500  19501 -1030  19504 0

c  1+1 --> 2
c    (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0 ∧  p_1030) -> (-b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0)
c  in CNF:
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_2
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨  b^{103, 11}_1
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ -p_1030 ∨ -b^{103, 11}_0
c  in DIMACS:
 19499  19500 -19501 -1030 -19502 0
 19499  19500 -19501 -1030  19503 0
 19499  19500 -19501 -1030 -19504 0

c  2+1 --> break 
c    (-b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 19499 -19500  19501 -1030 1162 0


c  2-1 --> 1
c    (-b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧ -p_1030) -> (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0)
c  in CNF:
c     b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_2
c     b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_1
c     b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨  b^{103, 11}_0
c  in DIMACS:
 19499 -19500  19501  1030 -19502 0
 19499 -19500  19501  1030 -19503 0
 19499 -19500  19501  1030  19504 0

c  1-1 --> 0
c    (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0 ∧ -p_1030) -> (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧ -b^{103, 11}_0)
c  in CNF:
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_2
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_1
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_0
c  in DIMACS:
 19499  19500 -19501  1030 -19502 0
 19499  19500 -19501  1030 -19503 0
 19499  19500 -19501  1030 -19504 0

c  0-1 --> -1
c    (-b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧ -p_1030) -> ( b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0)
c  in CNF:
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨  b^{103, 11}_2
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_1
c     b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨  b^{103, 11}_0
c  in DIMACS:
 19499  19500  19501  1030  19502 0
 19499  19500  19501  1030 -19503 0
 19499  19500  19501  1030  19504 0

c  -1-1 --> -2
c    ( b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧  b^{103, 10}_0 ∧ -p_1030) -> ( b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0)
c  in CNF:
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨  b^{103, 11}_2
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨  b^{103, 11}_1
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨  p_1030 ∨ -b^{103, 11}_0
c  in DIMACS:
-19499  19500 -19501  1030  19502 0
-19499  19500 -19501  1030  19503 0
-19499  19500 -19501  1030 -19504 0

c  -2-1 --> break 
c    ( b^{103, 10}_2 ∧  b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨  b^{103, 10}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-19499 -19500  19501  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 10}_2 ∧ -b^{103, 10}_1 ∧ -b^{103, 10}_0 ∧ true) 
c  in CNF:
c    -b^{103, 10}_2 ∨  b^{103, 10}_1 ∨  b^{103, 10}_0 ∨ false 
c  in DIMACS:
-19499  19500  19501  0

c  3 does not represent an automaton state.
c    -(-b^{103, 10}_2 ∧  b^{103, 10}_1 ∧  b^{103, 10}_0 ∧ true) 
c  in CNF:
c     b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ false 
c  in DIMACS:
 19499 -19500 -19501  0
c  -3 does not represent an automaton state.
c    -( b^{103, 10}_2 ∧  b^{103, 10}_1 ∧  b^{103, 10}_0 ∧ true) 
c  in CNF:
c    -b^{103, 10}_2 ∨ -b^{103, 10}_1 ∨ -b^{103, 10}_0 ∨ false 
c  in DIMACS:
-19499 -19500 -19501  0

c i = 11
c  -2+1 --> -1
c    ( b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧  p_1133) -> ( b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧  b^{103, 12}_0)
c  in CNF:
c    -b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨  b^{103, 12}_2
c    -b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_1
c    -b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨  b^{103, 12}_0
c  in DIMACS:
-19502 -19503  19504 -1133  19505 0
-19502 -19503  19504 -1133 -19506 0
-19502 -19503  19504 -1133  19507 0

c  -1+1 --> 0
c    ( b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0 ∧  p_1133) -> (-b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧ -b^{103, 12}_0)
c  in CNF:
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_2
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_1
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_0
c  in DIMACS:
-19502  19503 -19504 -1133 -19505 0
-19502  19503 -19504 -1133 -19506 0
-19502  19503 -19504 -1133 -19507 0

c  0+1 --> 1
c    (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧  p_1133) -> (-b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧  b^{103, 12}_0)
c  in CNF:
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_2
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_1
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨  b^{103, 12}_0
c  in DIMACS:
 19502  19503  19504 -1133 -19505 0
 19502  19503  19504 -1133 -19506 0
 19502  19503  19504 -1133  19507 0

c  1+1 --> 2
c    (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0 ∧  p_1133) -> (-b^{103, 12}_2 ∧  b^{103, 12}_1 ∧ -b^{103, 12}_0)
c  in CNF:
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_2
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨  b^{103, 12}_1
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ -p_1133 ∨ -b^{103, 12}_0
c  in DIMACS:
 19502  19503 -19504 -1133 -19505 0
 19502  19503 -19504 -1133  19506 0
 19502  19503 -19504 -1133 -19507 0

c  2+1 --> break 
c    (-b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧  p_1133) -> break
c  in CNF:
c     b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ -p_1133 ∨ break
c  in DIMACS:
 19502 -19503  19504 -1133 1162 0


c  2-1 --> 1
c    (-b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧ -p_1133) -> (-b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧  b^{103, 12}_0)
c  in CNF:
c     b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_2
c     b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_1
c     b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨  b^{103, 12}_0
c  in DIMACS:
 19502 -19503  19504  1133 -19505 0
 19502 -19503  19504  1133 -19506 0
 19502 -19503  19504  1133  19507 0

c  1-1 --> 0
c    (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0 ∧ -p_1133) -> (-b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧ -b^{103, 12}_0)
c  in CNF:
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_2
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_1
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_0
c  in DIMACS:
 19502  19503 -19504  1133 -19505 0
 19502  19503 -19504  1133 -19506 0
 19502  19503 -19504  1133 -19507 0

c  0-1 --> -1
c    (-b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧ -p_1133) -> ( b^{103, 12}_2 ∧ -b^{103, 12}_1 ∧  b^{103, 12}_0)
c  in CNF:
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨  b^{103, 12}_2
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_1
c     b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨  b^{103, 12}_0
c  in DIMACS:
 19502  19503  19504  1133  19505 0
 19502  19503  19504  1133 -19506 0
 19502  19503  19504  1133  19507 0

c  -1-1 --> -2
c    ( b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧  b^{103, 11}_0 ∧ -p_1133) -> ( b^{103, 12}_2 ∧  b^{103, 12}_1 ∧ -b^{103, 12}_0)
c  in CNF:
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨  b^{103, 12}_2
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨  b^{103, 12}_1
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨  p_1133 ∨ -b^{103, 12}_0
c  in DIMACS:
-19502  19503 -19504  1133  19505 0
-19502  19503 -19504  1133  19506 0
-19502  19503 -19504  1133 -19507 0

c  -2-1 --> break 
c    ( b^{103, 11}_2 ∧  b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧ -p_1133) -> break
c  in CNF:
c    -b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨  b^{103, 11}_0 ∨  p_1133 ∨ break
c  in DIMACS:
-19502 -19503  19504  1133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{103, 11}_2 ∧ -b^{103, 11}_1 ∧ -b^{103, 11}_0 ∧ true) 
c  in CNF:
c    -b^{103, 11}_2 ∨  b^{103, 11}_1 ∨  b^{103, 11}_0 ∨ false 
c  in DIMACS:
-19502  19503  19504  0

c  3 does not represent an automaton state.
c    -(-b^{103, 11}_2 ∧  b^{103, 11}_1 ∧  b^{103, 11}_0 ∧ true) 
c  in CNF:
c     b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ false 
c  in DIMACS:
 19502 -19503 -19504  0
c  -3 does not represent an automaton state.
c    -( b^{103, 11}_2 ∧  b^{103, 11}_1 ∧  b^{103, 11}_0 ∧ true) 
c  in CNF:
c    -b^{103, 11}_2 ∨ -b^{103, 11}_1 ∨ -b^{103, 11}_0 ∨ false 
c  in DIMACS:
-19502 -19503 -19504  0

c INIT for k = 104
c    -b^{104, 1}_2
c    -b^{104, 1}_1
c    -b^{104, 1}_0
c  in DIMACS:
-19508 0
-19509 0
-19510 0

c Transitions for k = 104
c i = 1
c  -2+1 --> -1
c    ( b^{104, 1}_2 ∧  b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧  p_104) -> ( b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0)
c  in CNF:
c    -b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨  b^{104, 2}_2
c    -b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_1
c    -b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨  b^{104, 2}_0
c  in DIMACS:
-19508 -19509  19510 -104  19511 0
-19508 -19509  19510 -104 -19512 0
-19508 -19509  19510 -104  19513 0

c  -1+1 --> 0
c    ( b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧  b^{104, 1}_0 ∧  p_104) -> (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧ -b^{104, 2}_0)
c  in CNF:
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_2
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_1
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_0
c  in DIMACS:
-19508  19509 -19510 -104 -19511 0
-19508  19509 -19510 -104 -19512 0
-19508  19509 -19510 -104 -19513 0

c  0+1 --> 1
c    (-b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧  p_104) -> (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0)
c  in CNF:
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_2
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_1
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨  b^{104, 2}_0
c  in DIMACS:
 19508  19509  19510 -104 -19511 0
 19508  19509  19510 -104 -19512 0
 19508  19509  19510 -104  19513 0

c  1+1 --> 2
c    (-b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧  b^{104, 1}_0 ∧  p_104) -> (-b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0)
c  in CNF:
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_2
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨  b^{104, 2}_1
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ -p_104 ∨ -b^{104, 2}_0
c  in DIMACS:
 19508  19509 -19510 -104 -19511 0
 19508  19509 -19510 -104  19512 0
 19508  19509 -19510 -104 -19513 0

c  2+1 --> break 
c    (-b^{104, 1}_2 ∧  b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧  p_104) -> break
c  in CNF:
c     b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ -p_104 ∨ break
c  in DIMACS:
 19508 -19509  19510 -104 1162 0


c  2-1 --> 1
c    (-b^{104, 1}_2 ∧  b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧ -p_104) -> (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0)
c  in CNF:
c     b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_2
c     b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_1
c     b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨  b^{104, 2}_0
c  in DIMACS:
 19508 -19509  19510  104 -19511 0
 19508 -19509  19510  104 -19512 0
 19508 -19509  19510  104  19513 0

c  1-1 --> 0
c    (-b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧  b^{104, 1}_0 ∧ -p_104) -> (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧ -b^{104, 2}_0)
c  in CNF:
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_2
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_1
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_0
c  in DIMACS:
 19508  19509 -19510  104 -19511 0
 19508  19509 -19510  104 -19512 0
 19508  19509 -19510  104 -19513 0

c  0-1 --> -1
c    (-b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧ -p_104) -> ( b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0)
c  in CNF:
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨  b^{104, 2}_2
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_1
c     b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨  b^{104, 2}_0
c  in DIMACS:
 19508  19509  19510  104  19511 0
 19508  19509  19510  104 -19512 0
 19508  19509  19510  104  19513 0

c  -1-1 --> -2
c    ( b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧  b^{104, 1}_0 ∧ -p_104) -> ( b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0)
c  in CNF:
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨  b^{104, 2}_2
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨  b^{104, 2}_1
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨  p_104 ∨ -b^{104, 2}_0
c  in DIMACS:
-19508  19509 -19510  104  19511 0
-19508  19509 -19510  104  19512 0
-19508  19509 -19510  104 -19513 0

c  -2-1 --> break 
c    ( b^{104, 1}_2 ∧  b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧ -p_104) -> break
c  in CNF:
c    -b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨  b^{104, 1}_0 ∨  p_104 ∨ break
c  in DIMACS:
-19508 -19509  19510  104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 1}_2 ∧ -b^{104, 1}_1 ∧ -b^{104, 1}_0 ∧ true) 
c  in CNF:
c    -b^{104, 1}_2 ∨  b^{104, 1}_1 ∨  b^{104, 1}_0 ∨ false 
c  in DIMACS:
-19508  19509  19510  0

c  3 does not represent an automaton state.
c    -(-b^{104, 1}_2 ∧  b^{104, 1}_1 ∧  b^{104, 1}_0 ∧ true) 
c  in CNF:
c     b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ false 
c  in DIMACS:
 19508 -19509 -19510  0
c  -3 does not represent an automaton state.
c    -( b^{104, 1}_2 ∧  b^{104, 1}_1 ∧  b^{104, 1}_0 ∧ true) 
c  in CNF:
c    -b^{104, 1}_2 ∨ -b^{104, 1}_1 ∨ -b^{104, 1}_0 ∨ false 
c  in DIMACS:
-19508 -19509 -19510  0

c i = 2
c  -2+1 --> -1
c    ( b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧  p_208) -> ( b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0)
c  in CNF:
c    -b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨  b^{104, 3}_2
c    -b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_1
c    -b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨  b^{104, 3}_0
c  in DIMACS:
-19511 -19512  19513 -208  19514 0
-19511 -19512  19513 -208 -19515 0
-19511 -19512  19513 -208  19516 0

c  -1+1 --> 0
c    ( b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0 ∧  p_208) -> (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧ -b^{104, 3}_0)
c  in CNF:
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_2
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_1
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_0
c  in DIMACS:
-19511  19512 -19513 -208 -19514 0
-19511  19512 -19513 -208 -19515 0
-19511  19512 -19513 -208 -19516 0

c  0+1 --> 1
c    (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧  p_208) -> (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0)
c  in CNF:
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_2
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_1
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨  b^{104, 3}_0
c  in DIMACS:
 19511  19512  19513 -208 -19514 0
 19511  19512  19513 -208 -19515 0
 19511  19512  19513 -208  19516 0

c  1+1 --> 2
c    (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0 ∧  p_208) -> (-b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0)
c  in CNF:
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_2
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨  b^{104, 3}_1
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ -p_208 ∨ -b^{104, 3}_0
c  in DIMACS:
 19511  19512 -19513 -208 -19514 0
 19511  19512 -19513 -208  19515 0
 19511  19512 -19513 -208 -19516 0

c  2+1 --> break 
c    (-b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧  p_208) -> break
c  in CNF:
c     b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 19511 -19512  19513 -208 1162 0


c  2-1 --> 1
c    (-b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧ -p_208) -> (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0)
c  in CNF:
c     b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_2
c     b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_1
c     b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨  b^{104, 3}_0
c  in DIMACS:
 19511 -19512  19513  208 -19514 0
 19511 -19512  19513  208 -19515 0
 19511 -19512  19513  208  19516 0

c  1-1 --> 0
c    (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0 ∧ -p_208) -> (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧ -b^{104, 3}_0)
c  in CNF:
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_2
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_1
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_0
c  in DIMACS:
 19511  19512 -19513  208 -19514 0
 19511  19512 -19513  208 -19515 0
 19511  19512 -19513  208 -19516 0

c  0-1 --> -1
c    (-b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧ -p_208) -> ( b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0)
c  in CNF:
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨  b^{104, 3}_2
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_1
c     b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨  b^{104, 3}_0
c  in DIMACS:
 19511  19512  19513  208  19514 0
 19511  19512  19513  208 -19515 0
 19511  19512  19513  208  19516 0

c  -1-1 --> -2
c    ( b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧  b^{104, 2}_0 ∧ -p_208) -> ( b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0)
c  in CNF:
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨  b^{104, 3}_2
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨  b^{104, 3}_1
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨  p_208 ∨ -b^{104, 3}_0
c  in DIMACS:
-19511  19512 -19513  208  19514 0
-19511  19512 -19513  208  19515 0
-19511  19512 -19513  208 -19516 0

c  -2-1 --> break 
c    ( b^{104, 2}_2 ∧  b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨  b^{104, 2}_0 ∨  p_208 ∨ break
c  in DIMACS:
-19511 -19512  19513  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 2}_2 ∧ -b^{104, 2}_1 ∧ -b^{104, 2}_0 ∧ true) 
c  in CNF:
c    -b^{104, 2}_2 ∨  b^{104, 2}_1 ∨  b^{104, 2}_0 ∨ false 
c  in DIMACS:
-19511  19512  19513  0

c  3 does not represent an automaton state.
c    -(-b^{104, 2}_2 ∧  b^{104, 2}_1 ∧  b^{104, 2}_0 ∧ true) 
c  in CNF:
c     b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ false 
c  in DIMACS:
 19511 -19512 -19513  0
c  -3 does not represent an automaton state.
c    -( b^{104, 2}_2 ∧  b^{104, 2}_1 ∧  b^{104, 2}_0 ∧ true) 
c  in CNF:
c    -b^{104, 2}_2 ∨ -b^{104, 2}_1 ∨ -b^{104, 2}_0 ∨ false 
c  in DIMACS:
-19511 -19512 -19513  0

c i = 3
c  -2+1 --> -1
c    ( b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧  p_312) -> ( b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0)
c  in CNF:
c    -b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨  b^{104, 4}_2
c    -b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_1
c    -b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨  b^{104, 4}_0
c  in DIMACS:
-19514 -19515  19516 -312  19517 0
-19514 -19515  19516 -312 -19518 0
-19514 -19515  19516 -312  19519 0

c  -1+1 --> 0
c    ( b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0 ∧  p_312) -> (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧ -b^{104, 4}_0)
c  in CNF:
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_2
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_1
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_0
c  in DIMACS:
-19514  19515 -19516 -312 -19517 0
-19514  19515 -19516 -312 -19518 0
-19514  19515 -19516 -312 -19519 0

c  0+1 --> 1
c    (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧  p_312) -> (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0)
c  in CNF:
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_2
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_1
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨  b^{104, 4}_0
c  in DIMACS:
 19514  19515  19516 -312 -19517 0
 19514  19515  19516 -312 -19518 0
 19514  19515  19516 -312  19519 0

c  1+1 --> 2
c    (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0 ∧  p_312) -> (-b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0)
c  in CNF:
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_2
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨  b^{104, 4}_1
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ -p_312 ∨ -b^{104, 4}_0
c  in DIMACS:
 19514  19515 -19516 -312 -19517 0
 19514  19515 -19516 -312  19518 0
 19514  19515 -19516 -312 -19519 0

c  2+1 --> break 
c    (-b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧  p_312) -> break
c  in CNF:
c     b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 19514 -19515  19516 -312 1162 0


c  2-1 --> 1
c    (-b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧ -p_312) -> (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0)
c  in CNF:
c     b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_2
c     b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_1
c     b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨  b^{104, 4}_0
c  in DIMACS:
 19514 -19515  19516  312 -19517 0
 19514 -19515  19516  312 -19518 0
 19514 -19515  19516  312  19519 0

c  1-1 --> 0
c    (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0 ∧ -p_312) -> (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧ -b^{104, 4}_0)
c  in CNF:
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_2
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_1
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_0
c  in DIMACS:
 19514  19515 -19516  312 -19517 0
 19514  19515 -19516  312 -19518 0
 19514  19515 -19516  312 -19519 0

c  0-1 --> -1
c    (-b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧ -p_312) -> ( b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0)
c  in CNF:
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨  b^{104, 4}_2
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_1
c     b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨  b^{104, 4}_0
c  in DIMACS:
 19514  19515  19516  312  19517 0
 19514  19515  19516  312 -19518 0
 19514  19515  19516  312  19519 0

c  -1-1 --> -2
c    ( b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧  b^{104, 3}_0 ∧ -p_312) -> ( b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0)
c  in CNF:
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨  b^{104, 4}_2
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨  b^{104, 4}_1
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨  p_312 ∨ -b^{104, 4}_0
c  in DIMACS:
-19514  19515 -19516  312  19517 0
-19514  19515 -19516  312  19518 0
-19514  19515 -19516  312 -19519 0

c  -2-1 --> break 
c    ( b^{104, 3}_2 ∧  b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨  b^{104, 3}_0 ∨  p_312 ∨ break
c  in DIMACS:
-19514 -19515  19516  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 3}_2 ∧ -b^{104, 3}_1 ∧ -b^{104, 3}_0 ∧ true) 
c  in CNF:
c    -b^{104, 3}_2 ∨  b^{104, 3}_1 ∨  b^{104, 3}_0 ∨ false 
c  in DIMACS:
-19514  19515  19516  0

c  3 does not represent an automaton state.
c    -(-b^{104, 3}_2 ∧  b^{104, 3}_1 ∧  b^{104, 3}_0 ∧ true) 
c  in CNF:
c     b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ false 
c  in DIMACS:
 19514 -19515 -19516  0
c  -3 does not represent an automaton state.
c    -( b^{104, 3}_2 ∧  b^{104, 3}_1 ∧  b^{104, 3}_0 ∧ true) 
c  in CNF:
c    -b^{104, 3}_2 ∨ -b^{104, 3}_1 ∨ -b^{104, 3}_0 ∨ false 
c  in DIMACS:
-19514 -19515 -19516  0

c i = 4
c  -2+1 --> -1
c    ( b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧  p_416) -> ( b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0)
c  in CNF:
c    -b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨  b^{104, 5}_2
c    -b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_1
c    -b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨  b^{104, 5}_0
c  in DIMACS:
-19517 -19518  19519 -416  19520 0
-19517 -19518  19519 -416 -19521 0
-19517 -19518  19519 -416  19522 0

c  -1+1 --> 0
c    ( b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0 ∧  p_416) -> (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧ -b^{104, 5}_0)
c  in CNF:
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_2
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_1
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_0
c  in DIMACS:
-19517  19518 -19519 -416 -19520 0
-19517  19518 -19519 -416 -19521 0
-19517  19518 -19519 -416 -19522 0

c  0+1 --> 1
c    (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧  p_416) -> (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0)
c  in CNF:
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_2
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_1
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨  b^{104, 5}_0
c  in DIMACS:
 19517  19518  19519 -416 -19520 0
 19517  19518  19519 -416 -19521 0
 19517  19518  19519 -416  19522 0

c  1+1 --> 2
c    (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0 ∧  p_416) -> (-b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0)
c  in CNF:
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_2
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨  b^{104, 5}_1
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ -p_416 ∨ -b^{104, 5}_0
c  in DIMACS:
 19517  19518 -19519 -416 -19520 0
 19517  19518 -19519 -416  19521 0
 19517  19518 -19519 -416 -19522 0

c  2+1 --> break 
c    (-b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧  p_416) -> break
c  in CNF:
c     b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 19517 -19518  19519 -416 1162 0


c  2-1 --> 1
c    (-b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧ -p_416) -> (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0)
c  in CNF:
c     b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_2
c     b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_1
c     b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨  b^{104, 5}_0
c  in DIMACS:
 19517 -19518  19519  416 -19520 0
 19517 -19518  19519  416 -19521 0
 19517 -19518  19519  416  19522 0

c  1-1 --> 0
c    (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0 ∧ -p_416) -> (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧ -b^{104, 5}_0)
c  in CNF:
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_2
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_1
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_0
c  in DIMACS:
 19517  19518 -19519  416 -19520 0
 19517  19518 -19519  416 -19521 0
 19517  19518 -19519  416 -19522 0

c  0-1 --> -1
c    (-b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧ -p_416) -> ( b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0)
c  in CNF:
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨  b^{104, 5}_2
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_1
c     b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨  b^{104, 5}_0
c  in DIMACS:
 19517  19518  19519  416  19520 0
 19517  19518  19519  416 -19521 0
 19517  19518  19519  416  19522 0

c  -1-1 --> -2
c    ( b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧  b^{104, 4}_0 ∧ -p_416) -> ( b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0)
c  in CNF:
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨  b^{104, 5}_2
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨  b^{104, 5}_1
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨  p_416 ∨ -b^{104, 5}_0
c  in DIMACS:
-19517  19518 -19519  416  19520 0
-19517  19518 -19519  416  19521 0
-19517  19518 -19519  416 -19522 0

c  -2-1 --> break 
c    ( b^{104, 4}_2 ∧  b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨  b^{104, 4}_0 ∨  p_416 ∨ break
c  in DIMACS:
-19517 -19518  19519  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 4}_2 ∧ -b^{104, 4}_1 ∧ -b^{104, 4}_0 ∧ true) 
c  in CNF:
c    -b^{104, 4}_2 ∨  b^{104, 4}_1 ∨  b^{104, 4}_0 ∨ false 
c  in DIMACS:
-19517  19518  19519  0

c  3 does not represent an automaton state.
c    -(-b^{104, 4}_2 ∧  b^{104, 4}_1 ∧  b^{104, 4}_0 ∧ true) 
c  in CNF:
c     b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ false 
c  in DIMACS:
 19517 -19518 -19519  0
c  -3 does not represent an automaton state.
c    -( b^{104, 4}_2 ∧  b^{104, 4}_1 ∧  b^{104, 4}_0 ∧ true) 
c  in CNF:
c    -b^{104, 4}_2 ∨ -b^{104, 4}_1 ∨ -b^{104, 4}_0 ∨ false 
c  in DIMACS:
-19517 -19518 -19519  0

c i = 5
c  -2+1 --> -1
c    ( b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧  p_520) -> ( b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0)
c  in CNF:
c    -b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨  b^{104, 6}_2
c    -b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_1
c    -b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨  b^{104, 6}_0
c  in DIMACS:
-19520 -19521  19522 -520  19523 0
-19520 -19521  19522 -520 -19524 0
-19520 -19521  19522 -520  19525 0

c  -1+1 --> 0
c    ( b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0 ∧  p_520) -> (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧ -b^{104, 6}_0)
c  in CNF:
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_2
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_1
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_0
c  in DIMACS:
-19520  19521 -19522 -520 -19523 0
-19520  19521 -19522 -520 -19524 0
-19520  19521 -19522 -520 -19525 0

c  0+1 --> 1
c    (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧  p_520) -> (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0)
c  in CNF:
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_2
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_1
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨  b^{104, 6}_0
c  in DIMACS:
 19520  19521  19522 -520 -19523 0
 19520  19521  19522 -520 -19524 0
 19520  19521  19522 -520  19525 0

c  1+1 --> 2
c    (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0 ∧  p_520) -> (-b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0)
c  in CNF:
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_2
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨  b^{104, 6}_1
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ -p_520 ∨ -b^{104, 6}_0
c  in DIMACS:
 19520  19521 -19522 -520 -19523 0
 19520  19521 -19522 -520  19524 0
 19520  19521 -19522 -520 -19525 0

c  2+1 --> break 
c    (-b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧  p_520) -> break
c  in CNF:
c     b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 19520 -19521  19522 -520 1162 0


c  2-1 --> 1
c    (-b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧ -p_520) -> (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0)
c  in CNF:
c     b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_2
c     b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_1
c     b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨  b^{104, 6}_0
c  in DIMACS:
 19520 -19521  19522  520 -19523 0
 19520 -19521  19522  520 -19524 0
 19520 -19521  19522  520  19525 0

c  1-1 --> 0
c    (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0 ∧ -p_520) -> (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧ -b^{104, 6}_0)
c  in CNF:
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_2
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_1
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_0
c  in DIMACS:
 19520  19521 -19522  520 -19523 0
 19520  19521 -19522  520 -19524 0
 19520  19521 -19522  520 -19525 0

c  0-1 --> -1
c    (-b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧ -p_520) -> ( b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0)
c  in CNF:
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨  b^{104, 6}_2
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_1
c     b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨  b^{104, 6}_0
c  in DIMACS:
 19520  19521  19522  520  19523 0
 19520  19521  19522  520 -19524 0
 19520  19521  19522  520  19525 0

c  -1-1 --> -2
c    ( b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧  b^{104, 5}_0 ∧ -p_520) -> ( b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0)
c  in CNF:
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨  b^{104, 6}_2
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨  b^{104, 6}_1
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨  p_520 ∨ -b^{104, 6}_0
c  in DIMACS:
-19520  19521 -19522  520  19523 0
-19520  19521 -19522  520  19524 0
-19520  19521 -19522  520 -19525 0

c  -2-1 --> break 
c    ( b^{104, 5}_2 ∧  b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨  b^{104, 5}_0 ∨  p_520 ∨ break
c  in DIMACS:
-19520 -19521  19522  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 5}_2 ∧ -b^{104, 5}_1 ∧ -b^{104, 5}_0 ∧ true) 
c  in CNF:
c    -b^{104, 5}_2 ∨  b^{104, 5}_1 ∨  b^{104, 5}_0 ∨ false 
c  in DIMACS:
-19520  19521  19522  0

c  3 does not represent an automaton state.
c    -(-b^{104, 5}_2 ∧  b^{104, 5}_1 ∧  b^{104, 5}_0 ∧ true) 
c  in CNF:
c     b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ false 
c  in DIMACS:
 19520 -19521 -19522  0
c  -3 does not represent an automaton state.
c    -( b^{104, 5}_2 ∧  b^{104, 5}_1 ∧  b^{104, 5}_0 ∧ true) 
c  in CNF:
c    -b^{104, 5}_2 ∨ -b^{104, 5}_1 ∨ -b^{104, 5}_0 ∨ false 
c  in DIMACS:
-19520 -19521 -19522  0

c i = 6
c  -2+1 --> -1
c    ( b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧  p_624) -> ( b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0)
c  in CNF:
c    -b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨  b^{104, 7}_2
c    -b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_1
c    -b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨  b^{104, 7}_0
c  in DIMACS:
-19523 -19524  19525 -624  19526 0
-19523 -19524  19525 -624 -19527 0
-19523 -19524  19525 -624  19528 0

c  -1+1 --> 0
c    ( b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0 ∧  p_624) -> (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧ -b^{104, 7}_0)
c  in CNF:
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_2
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_1
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_0
c  in DIMACS:
-19523  19524 -19525 -624 -19526 0
-19523  19524 -19525 -624 -19527 0
-19523  19524 -19525 -624 -19528 0

c  0+1 --> 1
c    (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧  p_624) -> (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0)
c  in CNF:
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_2
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_1
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨  b^{104, 7}_0
c  in DIMACS:
 19523  19524  19525 -624 -19526 0
 19523  19524  19525 -624 -19527 0
 19523  19524  19525 -624  19528 0

c  1+1 --> 2
c    (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0 ∧  p_624) -> (-b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0)
c  in CNF:
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_2
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨  b^{104, 7}_1
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ -p_624 ∨ -b^{104, 7}_0
c  in DIMACS:
 19523  19524 -19525 -624 -19526 0
 19523  19524 -19525 -624  19527 0
 19523  19524 -19525 -624 -19528 0

c  2+1 --> break 
c    (-b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧  p_624) -> break
c  in CNF:
c     b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 19523 -19524  19525 -624 1162 0


c  2-1 --> 1
c    (-b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧ -p_624) -> (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0)
c  in CNF:
c     b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_2
c     b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_1
c     b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨  b^{104, 7}_0
c  in DIMACS:
 19523 -19524  19525  624 -19526 0
 19523 -19524  19525  624 -19527 0
 19523 -19524  19525  624  19528 0

c  1-1 --> 0
c    (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0 ∧ -p_624) -> (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧ -b^{104, 7}_0)
c  in CNF:
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_2
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_1
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_0
c  in DIMACS:
 19523  19524 -19525  624 -19526 0
 19523  19524 -19525  624 -19527 0
 19523  19524 -19525  624 -19528 0

c  0-1 --> -1
c    (-b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧ -p_624) -> ( b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0)
c  in CNF:
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨  b^{104, 7}_2
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_1
c     b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨  b^{104, 7}_0
c  in DIMACS:
 19523  19524  19525  624  19526 0
 19523  19524  19525  624 -19527 0
 19523  19524  19525  624  19528 0

c  -1-1 --> -2
c    ( b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧  b^{104, 6}_0 ∧ -p_624) -> ( b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0)
c  in CNF:
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨  b^{104, 7}_2
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨  b^{104, 7}_1
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨  p_624 ∨ -b^{104, 7}_0
c  in DIMACS:
-19523  19524 -19525  624  19526 0
-19523  19524 -19525  624  19527 0
-19523  19524 -19525  624 -19528 0

c  -2-1 --> break 
c    ( b^{104, 6}_2 ∧  b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨  b^{104, 6}_0 ∨  p_624 ∨ break
c  in DIMACS:
-19523 -19524  19525  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 6}_2 ∧ -b^{104, 6}_1 ∧ -b^{104, 6}_0 ∧ true) 
c  in CNF:
c    -b^{104, 6}_2 ∨  b^{104, 6}_1 ∨  b^{104, 6}_0 ∨ false 
c  in DIMACS:
-19523  19524  19525  0

c  3 does not represent an automaton state.
c    -(-b^{104, 6}_2 ∧  b^{104, 6}_1 ∧  b^{104, 6}_0 ∧ true) 
c  in CNF:
c     b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ false 
c  in DIMACS:
 19523 -19524 -19525  0
c  -3 does not represent an automaton state.
c    -( b^{104, 6}_2 ∧  b^{104, 6}_1 ∧  b^{104, 6}_0 ∧ true) 
c  in CNF:
c    -b^{104, 6}_2 ∨ -b^{104, 6}_1 ∨ -b^{104, 6}_0 ∨ false 
c  in DIMACS:
-19523 -19524 -19525  0

c i = 7
c  -2+1 --> -1
c    ( b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧  p_728) -> ( b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0)
c  in CNF:
c    -b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨  b^{104, 8}_2
c    -b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_1
c    -b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨  b^{104, 8}_0
c  in DIMACS:
-19526 -19527  19528 -728  19529 0
-19526 -19527  19528 -728 -19530 0
-19526 -19527  19528 -728  19531 0

c  -1+1 --> 0
c    ( b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0 ∧  p_728) -> (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧ -b^{104, 8}_0)
c  in CNF:
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_2
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_1
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_0
c  in DIMACS:
-19526  19527 -19528 -728 -19529 0
-19526  19527 -19528 -728 -19530 0
-19526  19527 -19528 -728 -19531 0

c  0+1 --> 1
c    (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧  p_728) -> (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0)
c  in CNF:
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_2
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_1
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨  b^{104, 8}_0
c  in DIMACS:
 19526  19527  19528 -728 -19529 0
 19526  19527  19528 -728 -19530 0
 19526  19527  19528 -728  19531 0

c  1+1 --> 2
c    (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0 ∧  p_728) -> (-b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0)
c  in CNF:
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_2
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨  b^{104, 8}_1
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ -p_728 ∨ -b^{104, 8}_0
c  in DIMACS:
 19526  19527 -19528 -728 -19529 0
 19526  19527 -19528 -728  19530 0
 19526  19527 -19528 -728 -19531 0

c  2+1 --> break 
c    (-b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧  p_728) -> break
c  in CNF:
c     b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 19526 -19527  19528 -728 1162 0


c  2-1 --> 1
c    (-b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧ -p_728) -> (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0)
c  in CNF:
c     b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_2
c     b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_1
c     b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨  b^{104, 8}_0
c  in DIMACS:
 19526 -19527  19528  728 -19529 0
 19526 -19527  19528  728 -19530 0
 19526 -19527  19528  728  19531 0

c  1-1 --> 0
c    (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0 ∧ -p_728) -> (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧ -b^{104, 8}_0)
c  in CNF:
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_2
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_1
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_0
c  in DIMACS:
 19526  19527 -19528  728 -19529 0
 19526  19527 -19528  728 -19530 0
 19526  19527 -19528  728 -19531 0

c  0-1 --> -1
c    (-b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧ -p_728) -> ( b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0)
c  in CNF:
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨  b^{104, 8}_2
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_1
c     b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨  b^{104, 8}_0
c  in DIMACS:
 19526  19527  19528  728  19529 0
 19526  19527  19528  728 -19530 0
 19526  19527  19528  728  19531 0

c  -1-1 --> -2
c    ( b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧  b^{104, 7}_0 ∧ -p_728) -> ( b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0)
c  in CNF:
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨  b^{104, 8}_2
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨  b^{104, 8}_1
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨  p_728 ∨ -b^{104, 8}_0
c  in DIMACS:
-19526  19527 -19528  728  19529 0
-19526  19527 -19528  728  19530 0
-19526  19527 -19528  728 -19531 0

c  -2-1 --> break 
c    ( b^{104, 7}_2 ∧  b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨  b^{104, 7}_0 ∨  p_728 ∨ break
c  in DIMACS:
-19526 -19527  19528  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 7}_2 ∧ -b^{104, 7}_1 ∧ -b^{104, 7}_0 ∧ true) 
c  in CNF:
c    -b^{104, 7}_2 ∨  b^{104, 7}_1 ∨  b^{104, 7}_0 ∨ false 
c  in DIMACS:
-19526  19527  19528  0

c  3 does not represent an automaton state.
c    -(-b^{104, 7}_2 ∧  b^{104, 7}_1 ∧  b^{104, 7}_0 ∧ true) 
c  in CNF:
c     b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ false 
c  in DIMACS:
 19526 -19527 -19528  0
c  -3 does not represent an automaton state.
c    -( b^{104, 7}_2 ∧  b^{104, 7}_1 ∧  b^{104, 7}_0 ∧ true) 
c  in CNF:
c    -b^{104, 7}_2 ∨ -b^{104, 7}_1 ∨ -b^{104, 7}_0 ∨ false 
c  in DIMACS:
-19526 -19527 -19528  0

c i = 8
c  -2+1 --> -1
c    ( b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧  p_832) -> ( b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0)
c  in CNF:
c    -b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨  b^{104, 9}_2
c    -b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_1
c    -b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨  b^{104, 9}_0
c  in DIMACS:
-19529 -19530  19531 -832  19532 0
-19529 -19530  19531 -832 -19533 0
-19529 -19530  19531 -832  19534 0

c  -1+1 --> 0
c    ( b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0 ∧  p_832) -> (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧ -b^{104, 9}_0)
c  in CNF:
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_2
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_1
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_0
c  in DIMACS:
-19529  19530 -19531 -832 -19532 0
-19529  19530 -19531 -832 -19533 0
-19529  19530 -19531 -832 -19534 0

c  0+1 --> 1
c    (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧  p_832) -> (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0)
c  in CNF:
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_2
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_1
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨  b^{104, 9}_0
c  in DIMACS:
 19529  19530  19531 -832 -19532 0
 19529  19530  19531 -832 -19533 0
 19529  19530  19531 -832  19534 0

c  1+1 --> 2
c    (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0 ∧  p_832) -> (-b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0)
c  in CNF:
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_2
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨  b^{104, 9}_1
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ -p_832 ∨ -b^{104, 9}_0
c  in DIMACS:
 19529  19530 -19531 -832 -19532 0
 19529  19530 -19531 -832  19533 0
 19529  19530 -19531 -832 -19534 0

c  2+1 --> break 
c    (-b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧  p_832) -> break
c  in CNF:
c     b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 19529 -19530  19531 -832 1162 0


c  2-1 --> 1
c    (-b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧ -p_832) -> (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0)
c  in CNF:
c     b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_2
c     b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_1
c     b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨  b^{104, 9}_0
c  in DIMACS:
 19529 -19530  19531  832 -19532 0
 19529 -19530  19531  832 -19533 0
 19529 -19530  19531  832  19534 0

c  1-1 --> 0
c    (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0 ∧ -p_832) -> (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧ -b^{104, 9}_0)
c  in CNF:
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_2
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_1
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_0
c  in DIMACS:
 19529  19530 -19531  832 -19532 0
 19529  19530 -19531  832 -19533 0
 19529  19530 -19531  832 -19534 0

c  0-1 --> -1
c    (-b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧ -p_832) -> ( b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0)
c  in CNF:
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨  b^{104, 9}_2
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_1
c     b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨  b^{104, 9}_0
c  in DIMACS:
 19529  19530  19531  832  19532 0
 19529  19530  19531  832 -19533 0
 19529  19530  19531  832  19534 0

c  -1-1 --> -2
c    ( b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧  b^{104, 8}_0 ∧ -p_832) -> ( b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0)
c  in CNF:
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨  b^{104, 9}_2
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨  b^{104, 9}_1
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨  p_832 ∨ -b^{104, 9}_0
c  in DIMACS:
-19529  19530 -19531  832  19532 0
-19529  19530 -19531  832  19533 0
-19529  19530 -19531  832 -19534 0

c  -2-1 --> break 
c    ( b^{104, 8}_2 ∧  b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨  b^{104, 8}_0 ∨  p_832 ∨ break
c  in DIMACS:
-19529 -19530  19531  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 8}_2 ∧ -b^{104, 8}_1 ∧ -b^{104, 8}_0 ∧ true) 
c  in CNF:
c    -b^{104, 8}_2 ∨  b^{104, 8}_1 ∨  b^{104, 8}_0 ∨ false 
c  in DIMACS:
-19529  19530  19531  0

c  3 does not represent an automaton state.
c    -(-b^{104, 8}_2 ∧  b^{104, 8}_1 ∧  b^{104, 8}_0 ∧ true) 
c  in CNF:
c     b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ false 
c  in DIMACS:
 19529 -19530 -19531  0
c  -3 does not represent an automaton state.
c    -( b^{104, 8}_2 ∧  b^{104, 8}_1 ∧  b^{104, 8}_0 ∧ true) 
c  in CNF:
c    -b^{104, 8}_2 ∨ -b^{104, 8}_1 ∨ -b^{104, 8}_0 ∨ false 
c  in DIMACS:
-19529 -19530 -19531  0

c i = 9
c  -2+1 --> -1
c    ( b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧  p_936) -> ( b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0)
c  in CNF:
c    -b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨  b^{104, 10}_2
c    -b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_1
c    -b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨  b^{104, 10}_0
c  in DIMACS:
-19532 -19533  19534 -936  19535 0
-19532 -19533  19534 -936 -19536 0
-19532 -19533  19534 -936  19537 0

c  -1+1 --> 0
c    ( b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0 ∧  p_936) -> (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧ -b^{104, 10}_0)
c  in CNF:
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_2
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_1
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_0
c  in DIMACS:
-19532  19533 -19534 -936 -19535 0
-19532  19533 -19534 -936 -19536 0
-19532  19533 -19534 -936 -19537 0

c  0+1 --> 1
c    (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧  p_936) -> (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0)
c  in CNF:
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_2
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_1
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨  b^{104, 10}_0
c  in DIMACS:
 19532  19533  19534 -936 -19535 0
 19532  19533  19534 -936 -19536 0
 19532  19533  19534 -936  19537 0

c  1+1 --> 2
c    (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0 ∧  p_936) -> (-b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0)
c  in CNF:
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_2
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨  b^{104, 10}_1
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ -p_936 ∨ -b^{104, 10}_0
c  in DIMACS:
 19532  19533 -19534 -936 -19535 0
 19532  19533 -19534 -936  19536 0
 19532  19533 -19534 -936 -19537 0

c  2+1 --> break 
c    (-b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧  p_936) -> break
c  in CNF:
c     b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 19532 -19533  19534 -936 1162 0


c  2-1 --> 1
c    (-b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧ -p_936) -> (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0)
c  in CNF:
c     b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_2
c     b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_1
c     b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨  b^{104, 10}_0
c  in DIMACS:
 19532 -19533  19534  936 -19535 0
 19532 -19533  19534  936 -19536 0
 19532 -19533  19534  936  19537 0

c  1-1 --> 0
c    (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0 ∧ -p_936) -> (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧ -b^{104, 10}_0)
c  in CNF:
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_2
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_1
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_0
c  in DIMACS:
 19532  19533 -19534  936 -19535 0
 19532  19533 -19534  936 -19536 0
 19532  19533 -19534  936 -19537 0

c  0-1 --> -1
c    (-b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧ -p_936) -> ( b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0)
c  in CNF:
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨  b^{104, 10}_2
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_1
c     b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨  b^{104, 10}_0
c  in DIMACS:
 19532  19533  19534  936  19535 0
 19532  19533  19534  936 -19536 0
 19532  19533  19534  936  19537 0

c  -1-1 --> -2
c    ( b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧  b^{104, 9}_0 ∧ -p_936) -> ( b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0)
c  in CNF:
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨  b^{104, 10}_2
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨  b^{104, 10}_1
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨  p_936 ∨ -b^{104, 10}_0
c  in DIMACS:
-19532  19533 -19534  936  19535 0
-19532  19533 -19534  936  19536 0
-19532  19533 -19534  936 -19537 0

c  -2-1 --> break 
c    ( b^{104, 9}_2 ∧  b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨  b^{104, 9}_0 ∨  p_936 ∨ break
c  in DIMACS:
-19532 -19533  19534  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 9}_2 ∧ -b^{104, 9}_1 ∧ -b^{104, 9}_0 ∧ true) 
c  in CNF:
c    -b^{104, 9}_2 ∨  b^{104, 9}_1 ∨  b^{104, 9}_0 ∨ false 
c  in DIMACS:
-19532  19533  19534  0

c  3 does not represent an automaton state.
c    -(-b^{104, 9}_2 ∧  b^{104, 9}_1 ∧  b^{104, 9}_0 ∧ true) 
c  in CNF:
c     b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ false 
c  in DIMACS:
 19532 -19533 -19534  0
c  -3 does not represent an automaton state.
c    -( b^{104, 9}_2 ∧  b^{104, 9}_1 ∧  b^{104, 9}_0 ∧ true) 
c  in CNF:
c    -b^{104, 9}_2 ∨ -b^{104, 9}_1 ∨ -b^{104, 9}_0 ∨ false 
c  in DIMACS:
-19532 -19533 -19534  0

c i = 10
c  -2+1 --> -1
c    ( b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧  p_1040) -> ( b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0)
c  in CNF:
c    -b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨  b^{104, 11}_2
c    -b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_1
c    -b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨  b^{104, 11}_0
c  in DIMACS:
-19535 -19536  19537 -1040  19538 0
-19535 -19536  19537 -1040 -19539 0
-19535 -19536  19537 -1040  19540 0

c  -1+1 --> 0
c    ( b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0 ∧  p_1040) -> (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧ -b^{104, 11}_0)
c  in CNF:
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_2
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_1
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_0
c  in DIMACS:
-19535  19536 -19537 -1040 -19538 0
-19535  19536 -19537 -1040 -19539 0
-19535  19536 -19537 -1040 -19540 0

c  0+1 --> 1
c    (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧  p_1040) -> (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0)
c  in CNF:
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_2
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_1
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨  b^{104, 11}_0
c  in DIMACS:
 19535  19536  19537 -1040 -19538 0
 19535  19536  19537 -1040 -19539 0
 19535  19536  19537 -1040  19540 0

c  1+1 --> 2
c    (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0 ∧  p_1040) -> (-b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0)
c  in CNF:
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_2
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨  b^{104, 11}_1
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ -p_1040 ∨ -b^{104, 11}_0
c  in DIMACS:
 19535  19536 -19537 -1040 -19538 0
 19535  19536 -19537 -1040  19539 0
 19535  19536 -19537 -1040 -19540 0

c  2+1 --> break 
c    (-b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 19535 -19536  19537 -1040 1162 0


c  2-1 --> 1
c    (-b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧ -p_1040) -> (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0)
c  in CNF:
c     b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_2
c     b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_1
c     b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨  b^{104, 11}_0
c  in DIMACS:
 19535 -19536  19537  1040 -19538 0
 19535 -19536  19537  1040 -19539 0
 19535 -19536  19537  1040  19540 0

c  1-1 --> 0
c    (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0 ∧ -p_1040) -> (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧ -b^{104, 11}_0)
c  in CNF:
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_2
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_1
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_0
c  in DIMACS:
 19535  19536 -19537  1040 -19538 0
 19535  19536 -19537  1040 -19539 0
 19535  19536 -19537  1040 -19540 0

c  0-1 --> -1
c    (-b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧ -p_1040) -> ( b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0)
c  in CNF:
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨  b^{104, 11}_2
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_1
c     b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨  b^{104, 11}_0
c  in DIMACS:
 19535  19536  19537  1040  19538 0
 19535  19536  19537  1040 -19539 0
 19535  19536  19537  1040  19540 0

c  -1-1 --> -2
c    ( b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧  b^{104, 10}_0 ∧ -p_1040) -> ( b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0)
c  in CNF:
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨  b^{104, 11}_2
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨  b^{104, 11}_1
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨  p_1040 ∨ -b^{104, 11}_0
c  in DIMACS:
-19535  19536 -19537  1040  19538 0
-19535  19536 -19537  1040  19539 0
-19535  19536 -19537  1040 -19540 0

c  -2-1 --> break 
c    ( b^{104, 10}_2 ∧  b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨  b^{104, 10}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-19535 -19536  19537  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 10}_2 ∧ -b^{104, 10}_1 ∧ -b^{104, 10}_0 ∧ true) 
c  in CNF:
c    -b^{104, 10}_2 ∨  b^{104, 10}_1 ∨  b^{104, 10}_0 ∨ false 
c  in DIMACS:
-19535  19536  19537  0

c  3 does not represent an automaton state.
c    -(-b^{104, 10}_2 ∧  b^{104, 10}_1 ∧  b^{104, 10}_0 ∧ true) 
c  in CNF:
c     b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ false 
c  in DIMACS:
 19535 -19536 -19537  0
c  -3 does not represent an automaton state.
c    -( b^{104, 10}_2 ∧  b^{104, 10}_1 ∧  b^{104, 10}_0 ∧ true) 
c  in CNF:
c    -b^{104, 10}_2 ∨ -b^{104, 10}_1 ∨ -b^{104, 10}_0 ∨ false 
c  in DIMACS:
-19535 -19536 -19537  0

c i = 11
c  -2+1 --> -1
c    ( b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧  p_1144) -> ( b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧  b^{104, 12}_0)
c  in CNF:
c    -b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨  b^{104, 12}_2
c    -b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_1
c    -b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨  b^{104, 12}_0
c  in DIMACS:
-19538 -19539  19540 -1144  19541 0
-19538 -19539  19540 -1144 -19542 0
-19538 -19539  19540 -1144  19543 0

c  -1+1 --> 0
c    ( b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0 ∧  p_1144) -> (-b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧ -b^{104, 12}_0)
c  in CNF:
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_2
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_1
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_0
c  in DIMACS:
-19538  19539 -19540 -1144 -19541 0
-19538  19539 -19540 -1144 -19542 0
-19538  19539 -19540 -1144 -19543 0

c  0+1 --> 1
c    (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧  p_1144) -> (-b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧  b^{104, 12}_0)
c  in CNF:
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_2
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_1
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨  b^{104, 12}_0
c  in DIMACS:
 19538  19539  19540 -1144 -19541 0
 19538  19539  19540 -1144 -19542 0
 19538  19539  19540 -1144  19543 0

c  1+1 --> 2
c    (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0 ∧  p_1144) -> (-b^{104, 12}_2 ∧  b^{104, 12}_1 ∧ -b^{104, 12}_0)
c  in CNF:
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_2
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨  b^{104, 12}_1
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ -p_1144 ∨ -b^{104, 12}_0
c  in DIMACS:
 19538  19539 -19540 -1144 -19541 0
 19538  19539 -19540 -1144  19542 0
 19538  19539 -19540 -1144 -19543 0

c  2+1 --> break 
c    (-b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 19538 -19539  19540 -1144 1162 0


c  2-1 --> 1
c    (-b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧ -p_1144) -> (-b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧  b^{104, 12}_0)
c  in CNF:
c     b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_2
c     b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_1
c     b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨  b^{104, 12}_0
c  in DIMACS:
 19538 -19539  19540  1144 -19541 0
 19538 -19539  19540  1144 -19542 0
 19538 -19539  19540  1144  19543 0

c  1-1 --> 0
c    (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0 ∧ -p_1144) -> (-b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧ -b^{104, 12}_0)
c  in CNF:
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_2
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_1
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_0
c  in DIMACS:
 19538  19539 -19540  1144 -19541 0
 19538  19539 -19540  1144 -19542 0
 19538  19539 -19540  1144 -19543 0

c  0-1 --> -1
c    (-b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧ -p_1144) -> ( b^{104, 12}_2 ∧ -b^{104, 12}_1 ∧  b^{104, 12}_0)
c  in CNF:
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨  b^{104, 12}_2
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_1
c     b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨  b^{104, 12}_0
c  in DIMACS:
 19538  19539  19540  1144  19541 0
 19538  19539  19540  1144 -19542 0
 19538  19539  19540  1144  19543 0

c  -1-1 --> -2
c    ( b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧  b^{104, 11}_0 ∧ -p_1144) -> ( b^{104, 12}_2 ∧  b^{104, 12}_1 ∧ -b^{104, 12}_0)
c  in CNF:
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨  b^{104, 12}_2
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨  b^{104, 12}_1
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨  p_1144 ∨ -b^{104, 12}_0
c  in DIMACS:
-19538  19539 -19540  1144  19541 0
-19538  19539 -19540  1144  19542 0
-19538  19539 -19540  1144 -19543 0

c  -2-1 --> break 
c    ( b^{104, 11}_2 ∧  b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨  b^{104, 11}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-19538 -19539  19540  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{104, 11}_2 ∧ -b^{104, 11}_1 ∧ -b^{104, 11}_0 ∧ true) 
c  in CNF:
c    -b^{104, 11}_2 ∨  b^{104, 11}_1 ∨  b^{104, 11}_0 ∨ false 
c  in DIMACS:
-19538  19539  19540  0

c  3 does not represent an automaton state.
c    -(-b^{104, 11}_2 ∧  b^{104, 11}_1 ∧  b^{104, 11}_0 ∧ true) 
c  in CNF:
c     b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ false 
c  in DIMACS:
 19538 -19539 -19540  0
c  -3 does not represent an automaton state.
c    -( b^{104, 11}_2 ∧  b^{104, 11}_1 ∧  b^{104, 11}_0 ∧ true) 
c  in CNF:
c    -b^{104, 11}_2 ∨ -b^{104, 11}_1 ∨ -b^{104, 11}_0 ∨ false 
c  in DIMACS:
-19538 -19539 -19540  0

c INIT for k = 105
c    -b^{105, 1}_2
c    -b^{105, 1}_1
c    -b^{105, 1}_0
c  in DIMACS:
-19544 0
-19545 0
-19546 0

c Transitions for k = 105
c i = 1
c  -2+1 --> -1
c    ( b^{105, 1}_2 ∧  b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧  p_105) -> ( b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0)
c  in CNF:
c    -b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨  b^{105, 2}_2
c    -b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_1
c    -b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨  b^{105, 2}_0
c  in DIMACS:
-19544 -19545  19546 -105  19547 0
-19544 -19545  19546 -105 -19548 0
-19544 -19545  19546 -105  19549 0

c  -1+1 --> 0
c    ( b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧  b^{105, 1}_0 ∧  p_105) -> (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧ -b^{105, 2}_0)
c  in CNF:
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_2
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_1
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_0
c  in DIMACS:
-19544  19545 -19546 -105 -19547 0
-19544  19545 -19546 -105 -19548 0
-19544  19545 -19546 -105 -19549 0

c  0+1 --> 1
c    (-b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧  p_105) -> (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0)
c  in CNF:
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_2
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_1
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨  b^{105, 2}_0
c  in DIMACS:
 19544  19545  19546 -105 -19547 0
 19544  19545  19546 -105 -19548 0
 19544  19545  19546 -105  19549 0

c  1+1 --> 2
c    (-b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧  b^{105, 1}_0 ∧  p_105) -> (-b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0)
c  in CNF:
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_2
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨  b^{105, 2}_1
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ -p_105 ∨ -b^{105, 2}_0
c  in DIMACS:
 19544  19545 -19546 -105 -19547 0
 19544  19545 -19546 -105  19548 0
 19544  19545 -19546 -105 -19549 0

c  2+1 --> break 
c    (-b^{105, 1}_2 ∧  b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧  p_105) -> break
c  in CNF:
c     b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ -p_105 ∨ break
c  in DIMACS:
 19544 -19545  19546 -105 1162 0


c  2-1 --> 1
c    (-b^{105, 1}_2 ∧  b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧ -p_105) -> (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0)
c  in CNF:
c     b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_2
c     b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_1
c     b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨  b^{105, 2}_0
c  in DIMACS:
 19544 -19545  19546  105 -19547 0
 19544 -19545  19546  105 -19548 0
 19544 -19545  19546  105  19549 0

c  1-1 --> 0
c    (-b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧  b^{105, 1}_0 ∧ -p_105) -> (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧ -b^{105, 2}_0)
c  in CNF:
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_2
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_1
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_0
c  in DIMACS:
 19544  19545 -19546  105 -19547 0
 19544  19545 -19546  105 -19548 0
 19544  19545 -19546  105 -19549 0

c  0-1 --> -1
c    (-b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧ -p_105) -> ( b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0)
c  in CNF:
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨  b^{105, 2}_2
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_1
c     b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨  b^{105, 2}_0
c  in DIMACS:
 19544  19545  19546  105  19547 0
 19544  19545  19546  105 -19548 0
 19544  19545  19546  105  19549 0

c  -1-1 --> -2
c    ( b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧  b^{105, 1}_0 ∧ -p_105) -> ( b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0)
c  in CNF:
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨  b^{105, 2}_2
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨  b^{105, 2}_1
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨  p_105 ∨ -b^{105, 2}_0
c  in DIMACS:
-19544  19545 -19546  105  19547 0
-19544  19545 -19546  105  19548 0
-19544  19545 -19546  105 -19549 0

c  -2-1 --> break 
c    ( b^{105, 1}_2 ∧  b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧ -p_105) -> break
c  in CNF:
c    -b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨  b^{105, 1}_0 ∨  p_105 ∨ break
c  in DIMACS:
-19544 -19545  19546  105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 1}_2 ∧ -b^{105, 1}_1 ∧ -b^{105, 1}_0 ∧ true) 
c  in CNF:
c    -b^{105, 1}_2 ∨  b^{105, 1}_1 ∨  b^{105, 1}_0 ∨ false 
c  in DIMACS:
-19544  19545  19546  0

c  3 does not represent an automaton state.
c    -(-b^{105, 1}_2 ∧  b^{105, 1}_1 ∧  b^{105, 1}_0 ∧ true) 
c  in CNF:
c     b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ false 
c  in DIMACS:
 19544 -19545 -19546  0
c  -3 does not represent an automaton state.
c    -( b^{105, 1}_2 ∧  b^{105, 1}_1 ∧  b^{105, 1}_0 ∧ true) 
c  in CNF:
c    -b^{105, 1}_2 ∨ -b^{105, 1}_1 ∨ -b^{105, 1}_0 ∨ false 
c  in DIMACS:
-19544 -19545 -19546  0

c i = 2
c  -2+1 --> -1
c    ( b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧  p_210) -> ( b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0)
c  in CNF:
c    -b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨  b^{105, 3}_2
c    -b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_1
c    -b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨  b^{105, 3}_0
c  in DIMACS:
-19547 -19548  19549 -210  19550 0
-19547 -19548  19549 -210 -19551 0
-19547 -19548  19549 -210  19552 0

c  -1+1 --> 0
c    ( b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0 ∧  p_210) -> (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧ -b^{105, 3}_0)
c  in CNF:
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_2
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_1
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_0
c  in DIMACS:
-19547  19548 -19549 -210 -19550 0
-19547  19548 -19549 -210 -19551 0
-19547  19548 -19549 -210 -19552 0

c  0+1 --> 1
c    (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧  p_210) -> (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0)
c  in CNF:
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_2
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_1
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨  b^{105, 3}_0
c  in DIMACS:
 19547  19548  19549 -210 -19550 0
 19547  19548  19549 -210 -19551 0
 19547  19548  19549 -210  19552 0

c  1+1 --> 2
c    (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0 ∧  p_210) -> (-b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0)
c  in CNF:
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_2
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨  b^{105, 3}_1
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ -p_210 ∨ -b^{105, 3}_0
c  in DIMACS:
 19547  19548 -19549 -210 -19550 0
 19547  19548 -19549 -210  19551 0
 19547  19548 -19549 -210 -19552 0

c  2+1 --> break 
c    (-b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧  p_210) -> break
c  in CNF:
c     b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 19547 -19548  19549 -210 1162 0


c  2-1 --> 1
c    (-b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧ -p_210) -> (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0)
c  in CNF:
c     b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_2
c     b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_1
c     b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨  b^{105, 3}_0
c  in DIMACS:
 19547 -19548  19549  210 -19550 0
 19547 -19548  19549  210 -19551 0
 19547 -19548  19549  210  19552 0

c  1-1 --> 0
c    (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0 ∧ -p_210) -> (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧ -b^{105, 3}_0)
c  in CNF:
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_2
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_1
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_0
c  in DIMACS:
 19547  19548 -19549  210 -19550 0
 19547  19548 -19549  210 -19551 0
 19547  19548 -19549  210 -19552 0

c  0-1 --> -1
c    (-b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧ -p_210) -> ( b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0)
c  in CNF:
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨  b^{105, 3}_2
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_1
c     b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨  b^{105, 3}_0
c  in DIMACS:
 19547  19548  19549  210  19550 0
 19547  19548  19549  210 -19551 0
 19547  19548  19549  210  19552 0

c  -1-1 --> -2
c    ( b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧  b^{105, 2}_0 ∧ -p_210) -> ( b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0)
c  in CNF:
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨  b^{105, 3}_2
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨  b^{105, 3}_1
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨  p_210 ∨ -b^{105, 3}_0
c  in DIMACS:
-19547  19548 -19549  210  19550 0
-19547  19548 -19549  210  19551 0
-19547  19548 -19549  210 -19552 0

c  -2-1 --> break 
c    ( b^{105, 2}_2 ∧  b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨  b^{105, 2}_0 ∨  p_210 ∨ break
c  in DIMACS:
-19547 -19548  19549  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 2}_2 ∧ -b^{105, 2}_1 ∧ -b^{105, 2}_0 ∧ true) 
c  in CNF:
c    -b^{105, 2}_2 ∨  b^{105, 2}_1 ∨  b^{105, 2}_0 ∨ false 
c  in DIMACS:
-19547  19548  19549  0

c  3 does not represent an automaton state.
c    -(-b^{105, 2}_2 ∧  b^{105, 2}_1 ∧  b^{105, 2}_0 ∧ true) 
c  in CNF:
c     b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ false 
c  in DIMACS:
 19547 -19548 -19549  0
c  -3 does not represent an automaton state.
c    -( b^{105, 2}_2 ∧  b^{105, 2}_1 ∧  b^{105, 2}_0 ∧ true) 
c  in CNF:
c    -b^{105, 2}_2 ∨ -b^{105, 2}_1 ∨ -b^{105, 2}_0 ∨ false 
c  in DIMACS:
-19547 -19548 -19549  0

c i = 3
c  -2+1 --> -1
c    ( b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧  p_315) -> ( b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0)
c  in CNF:
c    -b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨  b^{105, 4}_2
c    -b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_1
c    -b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨  b^{105, 4}_0
c  in DIMACS:
-19550 -19551  19552 -315  19553 0
-19550 -19551  19552 -315 -19554 0
-19550 -19551  19552 -315  19555 0

c  -1+1 --> 0
c    ( b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0 ∧  p_315) -> (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧ -b^{105, 4}_0)
c  in CNF:
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_2
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_1
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_0
c  in DIMACS:
-19550  19551 -19552 -315 -19553 0
-19550  19551 -19552 -315 -19554 0
-19550  19551 -19552 -315 -19555 0

c  0+1 --> 1
c    (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧  p_315) -> (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0)
c  in CNF:
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_2
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_1
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨  b^{105, 4}_0
c  in DIMACS:
 19550  19551  19552 -315 -19553 0
 19550  19551  19552 -315 -19554 0
 19550  19551  19552 -315  19555 0

c  1+1 --> 2
c    (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0 ∧  p_315) -> (-b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0)
c  in CNF:
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_2
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨  b^{105, 4}_1
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ -p_315 ∨ -b^{105, 4}_0
c  in DIMACS:
 19550  19551 -19552 -315 -19553 0
 19550  19551 -19552 -315  19554 0
 19550  19551 -19552 -315 -19555 0

c  2+1 --> break 
c    (-b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧  p_315) -> break
c  in CNF:
c     b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 19550 -19551  19552 -315 1162 0


c  2-1 --> 1
c    (-b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧ -p_315) -> (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0)
c  in CNF:
c     b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_2
c     b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_1
c     b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨  b^{105, 4}_0
c  in DIMACS:
 19550 -19551  19552  315 -19553 0
 19550 -19551  19552  315 -19554 0
 19550 -19551  19552  315  19555 0

c  1-1 --> 0
c    (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0 ∧ -p_315) -> (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧ -b^{105, 4}_0)
c  in CNF:
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_2
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_1
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_0
c  in DIMACS:
 19550  19551 -19552  315 -19553 0
 19550  19551 -19552  315 -19554 0
 19550  19551 -19552  315 -19555 0

c  0-1 --> -1
c    (-b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧ -p_315) -> ( b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0)
c  in CNF:
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨  b^{105, 4}_2
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_1
c     b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨  b^{105, 4}_0
c  in DIMACS:
 19550  19551  19552  315  19553 0
 19550  19551  19552  315 -19554 0
 19550  19551  19552  315  19555 0

c  -1-1 --> -2
c    ( b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧  b^{105, 3}_0 ∧ -p_315) -> ( b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0)
c  in CNF:
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨  b^{105, 4}_2
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨  b^{105, 4}_1
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨  p_315 ∨ -b^{105, 4}_0
c  in DIMACS:
-19550  19551 -19552  315  19553 0
-19550  19551 -19552  315  19554 0
-19550  19551 -19552  315 -19555 0

c  -2-1 --> break 
c    ( b^{105, 3}_2 ∧  b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨  b^{105, 3}_0 ∨  p_315 ∨ break
c  in DIMACS:
-19550 -19551  19552  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 3}_2 ∧ -b^{105, 3}_1 ∧ -b^{105, 3}_0 ∧ true) 
c  in CNF:
c    -b^{105, 3}_2 ∨  b^{105, 3}_1 ∨  b^{105, 3}_0 ∨ false 
c  in DIMACS:
-19550  19551  19552  0

c  3 does not represent an automaton state.
c    -(-b^{105, 3}_2 ∧  b^{105, 3}_1 ∧  b^{105, 3}_0 ∧ true) 
c  in CNF:
c     b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ false 
c  in DIMACS:
 19550 -19551 -19552  0
c  -3 does not represent an automaton state.
c    -( b^{105, 3}_2 ∧  b^{105, 3}_1 ∧  b^{105, 3}_0 ∧ true) 
c  in CNF:
c    -b^{105, 3}_2 ∨ -b^{105, 3}_1 ∨ -b^{105, 3}_0 ∨ false 
c  in DIMACS:
-19550 -19551 -19552  0

c i = 4
c  -2+1 --> -1
c    ( b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧  p_420) -> ( b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0)
c  in CNF:
c    -b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨  b^{105, 5}_2
c    -b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_1
c    -b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨  b^{105, 5}_0
c  in DIMACS:
-19553 -19554  19555 -420  19556 0
-19553 -19554  19555 -420 -19557 0
-19553 -19554  19555 -420  19558 0

c  -1+1 --> 0
c    ( b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0 ∧  p_420) -> (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧ -b^{105, 5}_0)
c  in CNF:
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_2
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_1
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_0
c  in DIMACS:
-19553  19554 -19555 -420 -19556 0
-19553  19554 -19555 -420 -19557 0
-19553  19554 -19555 -420 -19558 0

c  0+1 --> 1
c    (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧  p_420) -> (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0)
c  in CNF:
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_2
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_1
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨  b^{105, 5}_0
c  in DIMACS:
 19553  19554  19555 -420 -19556 0
 19553  19554  19555 -420 -19557 0
 19553  19554  19555 -420  19558 0

c  1+1 --> 2
c    (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0 ∧  p_420) -> (-b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0)
c  in CNF:
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_2
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨  b^{105, 5}_1
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ -p_420 ∨ -b^{105, 5}_0
c  in DIMACS:
 19553  19554 -19555 -420 -19556 0
 19553  19554 -19555 -420  19557 0
 19553  19554 -19555 -420 -19558 0

c  2+1 --> break 
c    (-b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧  p_420) -> break
c  in CNF:
c     b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 19553 -19554  19555 -420 1162 0


c  2-1 --> 1
c    (-b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧ -p_420) -> (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0)
c  in CNF:
c     b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_2
c     b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_1
c     b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨  b^{105, 5}_0
c  in DIMACS:
 19553 -19554  19555  420 -19556 0
 19553 -19554  19555  420 -19557 0
 19553 -19554  19555  420  19558 0

c  1-1 --> 0
c    (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0 ∧ -p_420) -> (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧ -b^{105, 5}_0)
c  in CNF:
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_2
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_1
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_0
c  in DIMACS:
 19553  19554 -19555  420 -19556 0
 19553  19554 -19555  420 -19557 0
 19553  19554 -19555  420 -19558 0

c  0-1 --> -1
c    (-b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧ -p_420) -> ( b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0)
c  in CNF:
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨  b^{105, 5}_2
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_1
c     b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨  b^{105, 5}_0
c  in DIMACS:
 19553  19554  19555  420  19556 0
 19553  19554  19555  420 -19557 0
 19553  19554  19555  420  19558 0

c  -1-1 --> -2
c    ( b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧  b^{105, 4}_0 ∧ -p_420) -> ( b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0)
c  in CNF:
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨  b^{105, 5}_2
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨  b^{105, 5}_1
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨  p_420 ∨ -b^{105, 5}_0
c  in DIMACS:
-19553  19554 -19555  420  19556 0
-19553  19554 -19555  420  19557 0
-19553  19554 -19555  420 -19558 0

c  -2-1 --> break 
c    ( b^{105, 4}_2 ∧  b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨  b^{105, 4}_0 ∨  p_420 ∨ break
c  in DIMACS:
-19553 -19554  19555  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 4}_2 ∧ -b^{105, 4}_1 ∧ -b^{105, 4}_0 ∧ true) 
c  in CNF:
c    -b^{105, 4}_2 ∨  b^{105, 4}_1 ∨  b^{105, 4}_0 ∨ false 
c  in DIMACS:
-19553  19554  19555  0

c  3 does not represent an automaton state.
c    -(-b^{105, 4}_2 ∧  b^{105, 4}_1 ∧  b^{105, 4}_0 ∧ true) 
c  in CNF:
c     b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ false 
c  in DIMACS:
 19553 -19554 -19555  0
c  -3 does not represent an automaton state.
c    -( b^{105, 4}_2 ∧  b^{105, 4}_1 ∧  b^{105, 4}_0 ∧ true) 
c  in CNF:
c    -b^{105, 4}_2 ∨ -b^{105, 4}_1 ∨ -b^{105, 4}_0 ∨ false 
c  in DIMACS:
-19553 -19554 -19555  0

c i = 5
c  -2+1 --> -1
c    ( b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧  p_525) -> ( b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0)
c  in CNF:
c    -b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨  b^{105, 6}_2
c    -b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_1
c    -b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨  b^{105, 6}_0
c  in DIMACS:
-19556 -19557  19558 -525  19559 0
-19556 -19557  19558 -525 -19560 0
-19556 -19557  19558 -525  19561 0

c  -1+1 --> 0
c    ( b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0 ∧  p_525) -> (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧ -b^{105, 6}_0)
c  in CNF:
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_2
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_1
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_0
c  in DIMACS:
-19556  19557 -19558 -525 -19559 0
-19556  19557 -19558 -525 -19560 0
-19556  19557 -19558 -525 -19561 0

c  0+1 --> 1
c    (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧  p_525) -> (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0)
c  in CNF:
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_2
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_1
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨  b^{105, 6}_0
c  in DIMACS:
 19556  19557  19558 -525 -19559 0
 19556  19557  19558 -525 -19560 0
 19556  19557  19558 -525  19561 0

c  1+1 --> 2
c    (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0 ∧  p_525) -> (-b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0)
c  in CNF:
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_2
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨  b^{105, 6}_1
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ -p_525 ∨ -b^{105, 6}_0
c  in DIMACS:
 19556  19557 -19558 -525 -19559 0
 19556  19557 -19558 -525  19560 0
 19556  19557 -19558 -525 -19561 0

c  2+1 --> break 
c    (-b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧  p_525) -> break
c  in CNF:
c     b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 19556 -19557  19558 -525 1162 0


c  2-1 --> 1
c    (-b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧ -p_525) -> (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0)
c  in CNF:
c     b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_2
c     b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_1
c     b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨  b^{105, 6}_0
c  in DIMACS:
 19556 -19557  19558  525 -19559 0
 19556 -19557  19558  525 -19560 0
 19556 -19557  19558  525  19561 0

c  1-1 --> 0
c    (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0 ∧ -p_525) -> (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧ -b^{105, 6}_0)
c  in CNF:
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_2
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_1
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_0
c  in DIMACS:
 19556  19557 -19558  525 -19559 0
 19556  19557 -19558  525 -19560 0
 19556  19557 -19558  525 -19561 0

c  0-1 --> -1
c    (-b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧ -p_525) -> ( b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0)
c  in CNF:
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨  b^{105, 6}_2
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_1
c     b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨  b^{105, 6}_0
c  in DIMACS:
 19556  19557  19558  525  19559 0
 19556  19557  19558  525 -19560 0
 19556  19557  19558  525  19561 0

c  -1-1 --> -2
c    ( b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧  b^{105, 5}_0 ∧ -p_525) -> ( b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0)
c  in CNF:
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨  b^{105, 6}_2
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨  b^{105, 6}_1
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨  p_525 ∨ -b^{105, 6}_0
c  in DIMACS:
-19556  19557 -19558  525  19559 0
-19556  19557 -19558  525  19560 0
-19556  19557 -19558  525 -19561 0

c  -2-1 --> break 
c    ( b^{105, 5}_2 ∧  b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨  b^{105, 5}_0 ∨  p_525 ∨ break
c  in DIMACS:
-19556 -19557  19558  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 5}_2 ∧ -b^{105, 5}_1 ∧ -b^{105, 5}_0 ∧ true) 
c  in CNF:
c    -b^{105, 5}_2 ∨  b^{105, 5}_1 ∨  b^{105, 5}_0 ∨ false 
c  in DIMACS:
-19556  19557  19558  0

c  3 does not represent an automaton state.
c    -(-b^{105, 5}_2 ∧  b^{105, 5}_1 ∧  b^{105, 5}_0 ∧ true) 
c  in CNF:
c     b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ false 
c  in DIMACS:
 19556 -19557 -19558  0
c  -3 does not represent an automaton state.
c    -( b^{105, 5}_2 ∧  b^{105, 5}_1 ∧  b^{105, 5}_0 ∧ true) 
c  in CNF:
c    -b^{105, 5}_2 ∨ -b^{105, 5}_1 ∨ -b^{105, 5}_0 ∨ false 
c  in DIMACS:
-19556 -19557 -19558  0

c i = 6
c  -2+1 --> -1
c    ( b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧  p_630) -> ( b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0)
c  in CNF:
c    -b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨  b^{105, 7}_2
c    -b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_1
c    -b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨  b^{105, 7}_0
c  in DIMACS:
-19559 -19560  19561 -630  19562 0
-19559 -19560  19561 -630 -19563 0
-19559 -19560  19561 -630  19564 0

c  -1+1 --> 0
c    ( b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0 ∧  p_630) -> (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧ -b^{105, 7}_0)
c  in CNF:
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_2
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_1
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_0
c  in DIMACS:
-19559  19560 -19561 -630 -19562 0
-19559  19560 -19561 -630 -19563 0
-19559  19560 -19561 -630 -19564 0

c  0+1 --> 1
c    (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧  p_630) -> (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0)
c  in CNF:
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_2
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_1
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨  b^{105, 7}_0
c  in DIMACS:
 19559  19560  19561 -630 -19562 0
 19559  19560  19561 -630 -19563 0
 19559  19560  19561 -630  19564 0

c  1+1 --> 2
c    (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0 ∧  p_630) -> (-b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0)
c  in CNF:
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_2
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨  b^{105, 7}_1
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ -p_630 ∨ -b^{105, 7}_0
c  in DIMACS:
 19559  19560 -19561 -630 -19562 0
 19559  19560 -19561 -630  19563 0
 19559  19560 -19561 -630 -19564 0

c  2+1 --> break 
c    (-b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧  p_630) -> break
c  in CNF:
c     b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 19559 -19560  19561 -630 1162 0


c  2-1 --> 1
c    (-b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧ -p_630) -> (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0)
c  in CNF:
c     b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_2
c     b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_1
c     b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨  b^{105, 7}_0
c  in DIMACS:
 19559 -19560  19561  630 -19562 0
 19559 -19560  19561  630 -19563 0
 19559 -19560  19561  630  19564 0

c  1-1 --> 0
c    (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0 ∧ -p_630) -> (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧ -b^{105, 7}_0)
c  in CNF:
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_2
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_1
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_0
c  in DIMACS:
 19559  19560 -19561  630 -19562 0
 19559  19560 -19561  630 -19563 0
 19559  19560 -19561  630 -19564 0

c  0-1 --> -1
c    (-b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧ -p_630) -> ( b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0)
c  in CNF:
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨  b^{105, 7}_2
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_1
c     b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨  b^{105, 7}_0
c  in DIMACS:
 19559  19560  19561  630  19562 0
 19559  19560  19561  630 -19563 0
 19559  19560  19561  630  19564 0

c  -1-1 --> -2
c    ( b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧  b^{105, 6}_0 ∧ -p_630) -> ( b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0)
c  in CNF:
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨  b^{105, 7}_2
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨  b^{105, 7}_1
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨  p_630 ∨ -b^{105, 7}_0
c  in DIMACS:
-19559  19560 -19561  630  19562 0
-19559  19560 -19561  630  19563 0
-19559  19560 -19561  630 -19564 0

c  -2-1 --> break 
c    ( b^{105, 6}_2 ∧  b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨  b^{105, 6}_0 ∨  p_630 ∨ break
c  in DIMACS:
-19559 -19560  19561  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 6}_2 ∧ -b^{105, 6}_1 ∧ -b^{105, 6}_0 ∧ true) 
c  in CNF:
c    -b^{105, 6}_2 ∨  b^{105, 6}_1 ∨  b^{105, 6}_0 ∨ false 
c  in DIMACS:
-19559  19560  19561  0

c  3 does not represent an automaton state.
c    -(-b^{105, 6}_2 ∧  b^{105, 6}_1 ∧  b^{105, 6}_0 ∧ true) 
c  in CNF:
c     b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ false 
c  in DIMACS:
 19559 -19560 -19561  0
c  -3 does not represent an automaton state.
c    -( b^{105, 6}_2 ∧  b^{105, 6}_1 ∧  b^{105, 6}_0 ∧ true) 
c  in CNF:
c    -b^{105, 6}_2 ∨ -b^{105, 6}_1 ∨ -b^{105, 6}_0 ∨ false 
c  in DIMACS:
-19559 -19560 -19561  0

c i = 7
c  -2+1 --> -1
c    ( b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧  p_735) -> ( b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0)
c  in CNF:
c    -b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨  b^{105, 8}_2
c    -b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_1
c    -b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨  b^{105, 8}_0
c  in DIMACS:
-19562 -19563  19564 -735  19565 0
-19562 -19563  19564 -735 -19566 0
-19562 -19563  19564 -735  19567 0

c  -1+1 --> 0
c    ( b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0 ∧  p_735) -> (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧ -b^{105, 8}_0)
c  in CNF:
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_2
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_1
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_0
c  in DIMACS:
-19562  19563 -19564 -735 -19565 0
-19562  19563 -19564 -735 -19566 0
-19562  19563 -19564 -735 -19567 0

c  0+1 --> 1
c    (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧  p_735) -> (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0)
c  in CNF:
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_2
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_1
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨  b^{105, 8}_0
c  in DIMACS:
 19562  19563  19564 -735 -19565 0
 19562  19563  19564 -735 -19566 0
 19562  19563  19564 -735  19567 0

c  1+1 --> 2
c    (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0 ∧  p_735) -> (-b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0)
c  in CNF:
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_2
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨  b^{105, 8}_1
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ -p_735 ∨ -b^{105, 8}_0
c  in DIMACS:
 19562  19563 -19564 -735 -19565 0
 19562  19563 -19564 -735  19566 0
 19562  19563 -19564 -735 -19567 0

c  2+1 --> break 
c    (-b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧  p_735) -> break
c  in CNF:
c     b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 19562 -19563  19564 -735 1162 0


c  2-1 --> 1
c    (-b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧ -p_735) -> (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0)
c  in CNF:
c     b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_2
c     b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_1
c     b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨  b^{105, 8}_0
c  in DIMACS:
 19562 -19563  19564  735 -19565 0
 19562 -19563  19564  735 -19566 0
 19562 -19563  19564  735  19567 0

c  1-1 --> 0
c    (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0 ∧ -p_735) -> (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧ -b^{105, 8}_0)
c  in CNF:
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_2
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_1
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_0
c  in DIMACS:
 19562  19563 -19564  735 -19565 0
 19562  19563 -19564  735 -19566 0
 19562  19563 -19564  735 -19567 0

c  0-1 --> -1
c    (-b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧ -p_735) -> ( b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0)
c  in CNF:
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨  b^{105, 8}_2
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_1
c     b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨  b^{105, 8}_0
c  in DIMACS:
 19562  19563  19564  735  19565 0
 19562  19563  19564  735 -19566 0
 19562  19563  19564  735  19567 0

c  -1-1 --> -2
c    ( b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧  b^{105, 7}_0 ∧ -p_735) -> ( b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0)
c  in CNF:
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨  b^{105, 8}_2
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨  b^{105, 8}_1
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨  p_735 ∨ -b^{105, 8}_0
c  in DIMACS:
-19562  19563 -19564  735  19565 0
-19562  19563 -19564  735  19566 0
-19562  19563 -19564  735 -19567 0

c  -2-1 --> break 
c    ( b^{105, 7}_2 ∧  b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨  b^{105, 7}_0 ∨  p_735 ∨ break
c  in DIMACS:
-19562 -19563  19564  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 7}_2 ∧ -b^{105, 7}_1 ∧ -b^{105, 7}_0 ∧ true) 
c  in CNF:
c    -b^{105, 7}_2 ∨  b^{105, 7}_1 ∨  b^{105, 7}_0 ∨ false 
c  in DIMACS:
-19562  19563  19564  0

c  3 does not represent an automaton state.
c    -(-b^{105, 7}_2 ∧  b^{105, 7}_1 ∧  b^{105, 7}_0 ∧ true) 
c  in CNF:
c     b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ false 
c  in DIMACS:
 19562 -19563 -19564  0
c  -3 does not represent an automaton state.
c    -( b^{105, 7}_2 ∧  b^{105, 7}_1 ∧  b^{105, 7}_0 ∧ true) 
c  in CNF:
c    -b^{105, 7}_2 ∨ -b^{105, 7}_1 ∨ -b^{105, 7}_0 ∨ false 
c  in DIMACS:
-19562 -19563 -19564  0

c i = 8
c  -2+1 --> -1
c    ( b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧  p_840) -> ( b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0)
c  in CNF:
c    -b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨  b^{105, 9}_2
c    -b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_1
c    -b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨  b^{105, 9}_0
c  in DIMACS:
-19565 -19566  19567 -840  19568 0
-19565 -19566  19567 -840 -19569 0
-19565 -19566  19567 -840  19570 0

c  -1+1 --> 0
c    ( b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0 ∧  p_840) -> (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧ -b^{105, 9}_0)
c  in CNF:
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_2
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_1
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_0
c  in DIMACS:
-19565  19566 -19567 -840 -19568 0
-19565  19566 -19567 -840 -19569 0
-19565  19566 -19567 -840 -19570 0

c  0+1 --> 1
c    (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧  p_840) -> (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0)
c  in CNF:
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_2
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_1
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨  b^{105, 9}_0
c  in DIMACS:
 19565  19566  19567 -840 -19568 0
 19565  19566  19567 -840 -19569 0
 19565  19566  19567 -840  19570 0

c  1+1 --> 2
c    (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0 ∧  p_840) -> (-b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0)
c  in CNF:
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_2
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨  b^{105, 9}_1
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ -p_840 ∨ -b^{105, 9}_0
c  in DIMACS:
 19565  19566 -19567 -840 -19568 0
 19565  19566 -19567 -840  19569 0
 19565  19566 -19567 -840 -19570 0

c  2+1 --> break 
c    (-b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧  p_840) -> break
c  in CNF:
c     b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 19565 -19566  19567 -840 1162 0


c  2-1 --> 1
c    (-b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧ -p_840) -> (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0)
c  in CNF:
c     b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_2
c     b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_1
c     b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨  b^{105, 9}_0
c  in DIMACS:
 19565 -19566  19567  840 -19568 0
 19565 -19566  19567  840 -19569 0
 19565 -19566  19567  840  19570 0

c  1-1 --> 0
c    (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0 ∧ -p_840) -> (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧ -b^{105, 9}_0)
c  in CNF:
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_2
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_1
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_0
c  in DIMACS:
 19565  19566 -19567  840 -19568 0
 19565  19566 -19567  840 -19569 0
 19565  19566 -19567  840 -19570 0

c  0-1 --> -1
c    (-b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧ -p_840) -> ( b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0)
c  in CNF:
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨  b^{105, 9}_2
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_1
c     b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨  b^{105, 9}_0
c  in DIMACS:
 19565  19566  19567  840  19568 0
 19565  19566  19567  840 -19569 0
 19565  19566  19567  840  19570 0

c  -1-1 --> -2
c    ( b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧  b^{105, 8}_0 ∧ -p_840) -> ( b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0)
c  in CNF:
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨  b^{105, 9}_2
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨  b^{105, 9}_1
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨  p_840 ∨ -b^{105, 9}_0
c  in DIMACS:
-19565  19566 -19567  840  19568 0
-19565  19566 -19567  840  19569 0
-19565  19566 -19567  840 -19570 0

c  -2-1 --> break 
c    ( b^{105, 8}_2 ∧  b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨  b^{105, 8}_0 ∨  p_840 ∨ break
c  in DIMACS:
-19565 -19566  19567  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 8}_2 ∧ -b^{105, 8}_1 ∧ -b^{105, 8}_0 ∧ true) 
c  in CNF:
c    -b^{105, 8}_2 ∨  b^{105, 8}_1 ∨  b^{105, 8}_0 ∨ false 
c  in DIMACS:
-19565  19566  19567  0

c  3 does not represent an automaton state.
c    -(-b^{105, 8}_2 ∧  b^{105, 8}_1 ∧  b^{105, 8}_0 ∧ true) 
c  in CNF:
c     b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ false 
c  in DIMACS:
 19565 -19566 -19567  0
c  -3 does not represent an automaton state.
c    -( b^{105, 8}_2 ∧  b^{105, 8}_1 ∧  b^{105, 8}_0 ∧ true) 
c  in CNF:
c    -b^{105, 8}_2 ∨ -b^{105, 8}_1 ∨ -b^{105, 8}_0 ∨ false 
c  in DIMACS:
-19565 -19566 -19567  0

c i = 9
c  -2+1 --> -1
c    ( b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧  p_945) -> ( b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0)
c  in CNF:
c    -b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨  b^{105, 10}_2
c    -b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_1
c    -b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨  b^{105, 10}_0
c  in DIMACS:
-19568 -19569  19570 -945  19571 0
-19568 -19569  19570 -945 -19572 0
-19568 -19569  19570 -945  19573 0

c  -1+1 --> 0
c    ( b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0 ∧  p_945) -> (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧ -b^{105, 10}_0)
c  in CNF:
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_2
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_1
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_0
c  in DIMACS:
-19568  19569 -19570 -945 -19571 0
-19568  19569 -19570 -945 -19572 0
-19568  19569 -19570 -945 -19573 0

c  0+1 --> 1
c    (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧  p_945) -> (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0)
c  in CNF:
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_2
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_1
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨  b^{105, 10}_0
c  in DIMACS:
 19568  19569  19570 -945 -19571 0
 19568  19569  19570 -945 -19572 0
 19568  19569  19570 -945  19573 0

c  1+1 --> 2
c    (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0 ∧  p_945) -> (-b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0)
c  in CNF:
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_2
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨  b^{105, 10}_1
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ -p_945 ∨ -b^{105, 10}_0
c  in DIMACS:
 19568  19569 -19570 -945 -19571 0
 19568  19569 -19570 -945  19572 0
 19568  19569 -19570 -945 -19573 0

c  2+1 --> break 
c    (-b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧  p_945) -> break
c  in CNF:
c     b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 19568 -19569  19570 -945 1162 0


c  2-1 --> 1
c    (-b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧ -p_945) -> (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0)
c  in CNF:
c     b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_2
c     b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_1
c     b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨  b^{105, 10}_0
c  in DIMACS:
 19568 -19569  19570  945 -19571 0
 19568 -19569  19570  945 -19572 0
 19568 -19569  19570  945  19573 0

c  1-1 --> 0
c    (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0 ∧ -p_945) -> (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧ -b^{105, 10}_0)
c  in CNF:
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_2
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_1
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_0
c  in DIMACS:
 19568  19569 -19570  945 -19571 0
 19568  19569 -19570  945 -19572 0
 19568  19569 -19570  945 -19573 0

c  0-1 --> -1
c    (-b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧ -p_945) -> ( b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0)
c  in CNF:
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨  b^{105, 10}_2
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_1
c     b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨  b^{105, 10}_0
c  in DIMACS:
 19568  19569  19570  945  19571 0
 19568  19569  19570  945 -19572 0
 19568  19569  19570  945  19573 0

c  -1-1 --> -2
c    ( b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧  b^{105, 9}_0 ∧ -p_945) -> ( b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0)
c  in CNF:
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨  b^{105, 10}_2
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨  b^{105, 10}_1
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨  p_945 ∨ -b^{105, 10}_0
c  in DIMACS:
-19568  19569 -19570  945  19571 0
-19568  19569 -19570  945  19572 0
-19568  19569 -19570  945 -19573 0

c  -2-1 --> break 
c    ( b^{105, 9}_2 ∧  b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨  b^{105, 9}_0 ∨  p_945 ∨ break
c  in DIMACS:
-19568 -19569  19570  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 9}_2 ∧ -b^{105, 9}_1 ∧ -b^{105, 9}_0 ∧ true) 
c  in CNF:
c    -b^{105, 9}_2 ∨  b^{105, 9}_1 ∨  b^{105, 9}_0 ∨ false 
c  in DIMACS:
-19568  19569  19570  0

c  3 does not represent an automaton state.
c    -(-b^{105, 9}_2 ∧  b^{105, 9}_1 ∧  b^{105, 9}_0 ∧ true) 
c  in CNF:
c     b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ false 
c  in DIMACS:
 19568 -19569 -19570  0
c  -3 does not represent an automaton state.
c    -( b^{105, 9}_2 ∧  b^{105, 9}_1 ∧  b^{105, 9}_0 ∧ true) 
c  in CNF:
c    -b^{105, 9}_2 ∨ -b^{105, 9}_1 ∨ -b^{105, 9}_0 ∨ false 
c  in DIMACS:
-19568 -19569 -19570  0

c i = 10
c  -2+1 --> -1
c    ( b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧  p_1050) -> ( b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0)
c  in CNF:
c    -b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨  b^{105, 11}_2
c    -b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_1
c    -b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨  b^{105, 11}_0
c  in DIMACS:
-19571 -19572  19573 -1050  19574 0
-19571 -19572  19573 -1050 -19575 0
-19571 -19572  19573 -1050  19576 0

c  -1+1 --> 0
c    ( b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0 ∧  p_1050) -> (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧ -b^{105, 11}_0)
c  in CNF:
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_2
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_1
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_0
c  in DIMACS:
-19571  19572 -19573 -1050 -19574 0
-19571  19572 -19573 -1050 -19575 0
-19571  19572 -19573 -1050 -19576 0

c  0+1 --> 1
c    (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧  p_1050) -> (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0)
c  in CNF:
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_2
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_1
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨  b^{105, 11}_0
c  in DIMACS:
 19571  19572  19573 -1050 -19574 0
 19571  19572  19573 -1050 -19575 0
 19571  19572  19573 -1050  19576 0

c  1+1 --> 2
c    (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0 ∧  p_1050) -> (-b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0)
c  in CNF:
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_2
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨  b^{105, 11}_1
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ -p_1050 ∨ -b^{105, 11}_0
c  in DIMACS:
 19571  19572 -19573 -1050 -19574 0
 19571  19572 -19573 -1050  19575 0
 19571  19572 -19573 -1050 -19576 0

c  2+1 --> break 
c    (-b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 19571 -19572  19573 -1050 1162 0


c  2-1 --> 1
c    (-b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧ -p_1050) -> (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0)
c  in CNF:
c     b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_2
c     b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_1
c     b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨  b^{105, 11}_0
c  in DIMACS:
 19571 -19572  19573  1050 -19574 0
 19571 -19572  19573  1050 -19575 0
 19571 -19572  19573  1050  19576 0

c  1-1 --> 0
c    (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0 ∧ -p_1050) -> (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧ -b^{105, 11}_0)
c  in CNF:
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_2
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_1
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_0
c  in DIMACS:
 19571  19572 -19573  1050 -19574 0
 19571  19572 -19573  1050 -19575 0
 19571  19572 -19573  1050 -19576 0

c  0-1 --> -1
c    (-b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧ -p_1050) -> ( b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0)
c  in CNF:
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨  b^{105, 11}_2
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_1
c     b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨  b^{105, 11}_0
c  in DIMACS:
 19571  19572  19573  1050  19574 0
 19571  19572  19573  1050 -19575 0
 19571  19572  19573  1050  19576 0

c  -1-1 --> -2
c    ( b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧  b^{105, 10}_0 ∧ -p_1050) -> ( b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0)
c  in CNF:
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨  b^{105, 11}_2
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨  b^{105, 11}_1
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨  p_1050 ∨ -b^{105, 11}_0
c  in DIMACS:
-19571  19572 -19573  1050  19574 0
-19571  19572 -19573  1050  19575 0
-19571  19572 -19573  1050 -19576 0

c  -2-1 --> break 
c    ( b^{105, 10}_2 ∧  b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨  b^{105, 10}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-19571 -19572  19573  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 10}_2 ∧ -b^{105, 10}_1 ∧ -b^{105, 10}_0 ∧ true) 
c  in CNF:
c    -b^{105, 10}_2 ∨  b^{105, 10}_1 ∨  b^{105, 10}_0 ∨ false 
c  in DIMACS:
-19571  19572  19573  0

c  3 does not represent an automaton state.
c    -(-b^{105, 10}_2 ∧  b^{105, 10}_1 ∧  b^{105, 10}_0 ∧ true) 
c  in CNF:
c     b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ false 
c  in DIMACS:
 19571 -19572 -19573  0
c  -3 does not represent an automaton state.
c    -( b^{105, 10}_2 ∧  b^{105, 10}_1 ∧  b^{105, 10}_0 ∧ true) 
c  in CNF:
c    -b^{105, 10}_2 ∨ -b^{105, 10}_1 ∨ -b^{105, 10}_0 ∨ false 
c  in DIMACS:
-19571 -19572 -19573  0

c i = 11
c  -2+1 --> -1
c    ( b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧  p_1155) -> ( b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧  b^{105, 12}_0)
c  in CNF:
c    -b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨  b^{105, 12}_2
c    -b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_1
c    -b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨  b^{105, 12}_0
c  in DIMACS:
-19574 -19575  19576 -1155  19577 0
-19574 -19575  19576 -1155 -19578 0
-19574 -19575  19576 -1155  19579 0

c  -1+1 --> 0
c    ( b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0 ∧  p_1155) -> (-b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧ -b^{105, 12}_0)
c  in CNF:
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_2
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_1
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_0
c  in DIMACS:
-19574  19575 -19576 -1155 -19577 0
-19574  19575 -19576 -1155 -19578 0
-19574  19575 -19576 -1155 -19579 0

c  0+1 --> 1
c    (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧  p_1155) -> (-b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧  b^{105, 12}_0)
c  in CNF:
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_2
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_1
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨  b^{105, 12}_0
c  in DIMACS:
 19574  19575  19576 -1155 -19577 0
 19574  19575  19576 -1155 -19578 0
 19574  19575  19576 -1155  19579 0

c  1+1 --> 2
c    (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0 ∧  p_1155) -> (-b^{105, 12}_2 ∧  b^{105, 12}_1 ∧ -b^{105, 12}_0)
c  in CNF:
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_2
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨  b^{105, 12}_1
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ -p_1155 ∨ -b^{105, 12}_0
c  in DIMACS:
 19574  19575 -19576 -1155 -19577 0
 19574  19575 -19576 -1155  19578 0
 19574  19575 -19576 -1155 -19579 0

c  2+1 --> break 
c    (-b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 19574 -19575  19576 -1155 1162 0


c  2-1 --> 1
c    (-b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧ -p_1155) -> (-b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧  b^{105, 12}_0)
c  in CNF:
c     b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_2
c     b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_1
c     b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨  b^{105, 12}_0
c  in DIMACS:
 19574 -19575  19576  1155 -19577 0
 19574 -19575  19576  1155 -19578 0
 19574 -19575  19576  1155  19579 0

c  1-1 --> 0
c    (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0 ∧ -p_1155) -> (-b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧ -b^{105, 12}_0)
c  in CNF:
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_2
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_1
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_0
c  in DIMACS:
 19574  19575 -19576  1155 -19577 0
 19574  19575 -19576  1155 -19578 0
 19574  19575 -19576  1155 -19579 0

c  0-1 --> -1
c    (-b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧ -p_1155) -> ( b^{105, 12}_2 ∧ -b^{105, 12}_1 ∧  b^{105, 12}_0)
c  in CNF:
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨  b^{105, 12}_2
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_1
c     b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨  b^{105, 12}_0
c  in DIMACS:
 19574  19575  19576  1155  19577 0
 19574  19575  19576  1155 -19578 0
 19574  19575  19576  1155  19579 0

c  -1-1 --> -2
c    ( b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧  b^{105, 11}_0 ∧ -p_1155) -> ( b^{105, 12}_2 ∧  b^{105, 12}_1 ∧ -b^{105, 12}_0)
c  in CNF:
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨  b^{105, 12}_2
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨  b^{105, 12}_1
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨  p_1155 ∨ -b^{105, 12}_0
c  in DIMACS:
-19574  19575 -19576  1155  19577 0
-19574  19575 -19576  1155  19578 0
-19574  19575 -19576  1155 -19579 0

c  -2-1 --> break 
c    ( b^{105, 11}_2 ∧  b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨  b^{105, 11}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-19574 -19575  19576  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{105, 11}_2 ∧ -b^{105, 11}_1 ∧ -b^{105, 11}_0 ∧ true) 
c  in CNF:
c    -b^{105, 11}_2 ∨  b^{105, 11}_1 ∨  b^{105, 11}_0 ∨ false 
c  in DIMACS:
-19574  19575  19576  0

c  3 does not represent an automaton state.
c    -(-b^{105, 11}_2 ∧  b^{105, 11}_1 ∧  b^{105, 11}_0 ∧ true) 
c  in CNF:
c     b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ false 
c  in DIMACS:
 19574 -19575 -19576  0
c  -3 does not represent an automaton state.
c    -( b^{105, 11}_2 ∧  b^{105, 11}_1 ∧  b^{105, 11}_0 ∧ true) 
c  in CNF:
c    -b^{105, 11}_2 ∨ -b^{105, 11}_1 ∨ -b^{105, 11}_0 ∨ false 
c  in DIMACS:
-19574 -19575 -19576  0

c INIT for k = 106
c    -b^{106, 1}_2
c    -b^{106, 1}_1
c    -b^{106, 1}_0
c  in DIMACS:
-19580 0
-19581 0
-19582 0

c Transitions for k = 106
c i = 1
c  -2+1 --> -1
c    ( b^{106, 1}_2 ∧  b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧  p_106) -> ( b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0)
c  in CNF:
c    -b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨  b^{106, 2}_2
c    -b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_1
c    -b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨  b^{106, 2}_0
c  in DIMACS:
-19580 -19581  19582 -106  19583 0
-19580 -19581  19582 -106 -19584 0
-19580 -19581  19582 -106  19585 0

c  -1+1 --> 0
c    ( b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧  b^{106, 1}_0 ∧  p_106) -> (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧ -b^{106, 2}_0)
c  in CNF:
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_2
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_1
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_0
c  in DIMACS:
-19580  19581 -19582 -106 -19583 0
-19580  19581 -19582 -106 -19584 0
-19580  19581 -19582 -106 -19585 0

c  0+1 --> 1
c    (-b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧  p_106) -> (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0)
c  in CNF:
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_2
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_1
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨  b^{106, 2}_0
c  in DIMACS:
 19580  19581  19582 -106 -19583 0
 19580  19581  19582 -106 -19584 0
 19580  19581  19582 -106  19585 0

c  1+1 --> 2
c    (-b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧  b^{106, 1}_0 ∧  p_106) -> (-b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0)
c  in CNF:
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_2
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨  b^{106, 2}_1
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ -p_106 ∨ -b^{106, 2}_0
c  in DIMACS:
 19580  19581 -19582 -106 -19583 0
 19580  19581 -19582 -106  19584 0
 19580  19581 -19582 -106 -19585 0

c  2+1 --> break 
c    (-b^{106, 1}_2 ∧  b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧  p_106) -> break
c  in CNF:
c     b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ -p_106 ∨ break
c  in DIMACS:
 19580 -19581  19582 -106 1162 0


c  2-1 --> 1
c    (-b^{106, 1}_2 ∧  b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧ -p_106) -> (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0)
c  in CNF:
c     b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_2
c     b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_1
c     b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨  b^{106, 2}_0
c  in DIMACS:
 19580 -19581  19582  106 -19583 0
 19580 -19581  19582  106 -19584 0
 19580 -19581  19582  106  19585 0

c  1-1 --> 0
c    (-b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧  b^{106, 1}_0 ∧ -p_106) -> (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧ -b^{106, 2}_0)
c  in CNF:
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_2
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_1
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_0
c  in DIMACS:
 19580  19581 -19582  106 -19583 0
 19580  19581 -19582  106 -19584 0
 19580  19581 -19582  106 -19585 0

c  0-1 --> -1
c    (-b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧ -p_106) -> ( b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0)
c  in CNF:
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨  b^{106, 2}_2
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_1
c     b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨  b^{106, 2}_0
c  in DIMACS:
 19580  19581  19582  106  19583 0
 19580  19581  19582  106 -19584 0
 19580  19581  19582  106  19585 0

c  -1-1 --> -2
c    ( b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧  b^{106, 1}_0 ∧ -p_106) -> ( b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0)
c  in CNF:
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨  b^{106, 2}_2
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨  b^{106, 2}_1
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨  p_106 ∨ -b^{106, 2}_0
c  in DIMACS:
-19580  19581 -19582  106  19583 0
-19580  19581 -19582  106  19584 0
-19580  19581 -19582  106 -19585 0

c  -2-1 --> break 
c    ( b^{106, 1}_2 ∧  b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧ -p_106) -> break
c  in CNF:
c    -b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨  b^{106, 1}_0 ∨  p_106 ∨ break
c  in DIMACS:
-19580 -19581  19582  106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 1}_2 ∧ -b^{106, 1}_1 ∧ -b^{106, 1}_0 ∧ true) 
c  in CNF:
c    -b^{106, 1}_2 ∨  b^{106, 1}_1 ∨  b^{106, 1}_0 ∨ false 
c  in DIMACS:
-19580  19581  19582  0

c  3 does not represent an automaton state.
c    -(-b^{106, 1}_2 ∧  b^{106, 1}_1 ∧  b^{106, 1}_0 ∧ true) 
c  in CNF:
c     b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ false 
c  in DIMACS:
 19580 -19581 -19582  0
c  -3 does not represent an automaton state.
c    -( b^{106, 1}_2 ∧  b^{106, 1}_1 ∧  b^{106, 1}_0 ∧ true) 
c  in CNF:
c    -b^{106, 1}_2 ∨ -b^{106, 1}_1 ∨ -b^{106, 1}_0 ∨ false 
c  in DIMACS:
-19580 -19581 -19582  0

c i = 2
c  -2+1 --> -1
c    ( b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧  p_212) -> ( b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0)
c  in CNF:
c    -b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨  b^{106, 3}_2
c    -b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_1
c    -b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨  b^{106, 3}_0
c  in DIMACS:
-19583 -19584  19585 -212  19586 0
-19583 -19584  19585 -212 -19587 0
-19583 -19584  19585 -212  19588 0

c  -1+1 --> 0
c    ( b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0 ∧  p_212) -> (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧ -b^{106, 3}_0)
c  in CNF:
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_2
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_1
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_0
c  in DIMACS:
-19583  19584 -19585 -212 -19586 0
-19583  19584 -19585 -212 -19587 0
-19583  19584 -19585 -212 -19588 0

c  0+1 --> 1
c    (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧  p_212) -> (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0)
c  in CNF:
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_2
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_1
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨  b^{106, 3}_0
c  in DIMACS:
 19583  19584  19585 -212 -19586 0
 19583  19584  19585 -212 -19587 0
 19583  19584  19585 -212  19588 0

c  1+1 --> 2
c    (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0 ∧  p_212) -> (-b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0)
c  in CNF:
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_2
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨  b^{106, 3}_1
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ -p_212 ∨ -b^{106, 3}_0
c  in DIMACS:
 19583  19584 -19585 -212 -19586 0
 19583  19584 -19585 -212  19587 0
 19583  19584 -19585 -212 -19588 0

c  2+1 --> break 
c    (-b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧  p_212) -> break
c  in CNF:
c     b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 19583 -19584  19585 -212 1162 0


c  2-1 --> 1
c    (-b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧ -p_212) -> (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0)
c  in CNF:
c     b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_2
c     b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_1
c     b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨  b^{106, 3}_0
c  in DIMACS:
 19583 -19584  19585  212 -19586 0
 19583 -19584  19585  212 -19587 0
 19583 -19584  19585  212  19588 0

c  1-1 --> 0
c    (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0 ∧ -p_212) -> (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧ -b^{106, 3}_0)
c  in CNF:
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_2
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_1
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_0
c  in DIMACS:
 19583  19584 -19585  212 -19586 0
 19583  19584 -19585  212 -19587 0
 19583  19584 -19585  212 -19588 0

c  0-1 --> -1
c    (-b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧ -p_212) -> ( b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0)
c  in CNF:
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨  b^{106, 3}_2
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_1
c     b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨  b^{106, 3}_0
c  in DIMACS:
 19583  19584  19585  212  19586 0
 19583  19584  19585  212 -19587 0
 19583  19584  19585  212  19588 0

c  -1-1 --> -2
c    ( b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧  b^{106, 2}_0 ∧ -p_212) -> ( b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0)
c  in CNF:
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨  b^{106, 3}_2
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨  b^{106, 3}_1
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨  p_212 ∨ -b^{106, 3}_0
c  in DIMACS:
-19583  19584 -19585  212  19586 0
-19583  19584 -19585  212  19587 0
-19583  19584 -19585  212 -19588 0

c  -2-1 --> break 
c    ( b^{106, 2}_2 ∧  b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨  b^{106, 2}_0 ∨  p_212 ∨ break
c  in DIMACS:
-19583 -19584  19585  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 2}_2 ∧ -b^{106, 2}_1 ∧ -b^{106, 2}_0 ∧ true) 
c  in CNF:
c    -b^{106, 2}_2 ∨  b^{106, 2}_1 ∨  b^{106, 2}_0 ∨ false 
c  in DIMACS:
-19583  19584  19585  0

c  3 does not represent an automaton state.
c    -(-b^{106, 2}_2 ∧  b^{106, 2}_1 ∧  b^{106, 2}_0 ∧ true) 
c  in CNF:
c     b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ false 
c  in DIMACS:
 19583 -19584 -19585  0
c  -3 does not represent an automaton state.
c    -( b^{106, 2}_2 ∧  b^{106, 2}_1 ∧  b^{106, 2}_0 ∧ true) 
c  in CNF:
c    -b^{106, 2}_2 ∨ -b^{106, 2}_1 ∨ -b^{106, 2}_0 ∨ false 
c  in DIMACS:
-19583 -19584 -19585  0

c i = 3
c  -2+1 --> -1
c    ( b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧  p_318) -> ( b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0)
c  in CNF:
c    -b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨  b^{106, 4}_2
c    -b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_1
c    -b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨  b^{106, 4}_0
c  in DIMACS:
-19586 -19587  19588 -318  19589 0
-19586 -19587  19588 -318 -19590 0
-19586 -19587  19588 -318  19591 0

c  -1+1 --> 0
c    ( b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0 ∧  p_318) -> (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧ -b^{106, 4}_0)
c  in CNF:
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_2
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_1
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_0
c  in DIMACS:
-19586  19587 -19588 -318 -19589 0
-19586  19587 -19588 -318 -19590 0
-19586  19587 -19588 -318 -19591 0

c  0+1 --> 1
c    (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧  p_318) -> (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0)
c  in CNF:
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_2
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_1
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨  b^{106, 4}_0
c  in DIMACS:
 19586  19587  19588 -318 -19589 0
 19586  19587  19588 -318 -19590 0
 19586  19587  19588 -318  19591 0

c  1+1 --> 2
c    (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0 ∧  p_318) -> (-b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0)
c  in CNF:
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_2
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨  b^{106, 4}_1
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ -p_318 ∨ -b^{106, 4}_0
c  in DIMACS:
 19586  19587 -19588 -318 -19589 0
 19586  19587 -19588 -318  19590 0
 19586  19587 -19588 -318 -19591 0

c  2+1 --> break 
c    (-b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧  p_318) -> break
c  in CNF:
c     b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 19586 -19587  19588 -318 1162 0


c  2-1 --> 1
c    (-b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧ -p_318) -> (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0)
c  in CNF:
c     b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_2
c     b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_1
c     b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨  b^{106, 4}_0
c  in DIMACS:
 19586 -19587  19588  318 -19589 0
 19586 -19587  19588  318 -19590 0
 19586 -19587  19588  318  19591 0

c  1-1 --> 0
c    (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0 ∧ -p_318) -> (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧ -b^{106, 4}_0)
c  in CNF:
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_2
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_1
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_0
c  in DIMACS:
 19586  19587 -19588  318 -19589 0
 19586  19587 -19588  318 -19590 0
 19586  19587 -19588  318 -19591 0

c  0-1 --> -1
c    (-b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧ -p_318) -> ( b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0)
c  in CNF:
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨  b^{106, 4}_2
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_1
c     b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨  b^{106, 4}_0
c  in DIMACS:
 19586  19587  19588  318  19589 0
 19586  19587  19588  318 -19590 0
 19586  19587  19588  318  19591 0

c  -1-1 --> -2
c    ( b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧  b^{106, 3}_0 ∧ -p_318) -> ( b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0)
c  in CNF:
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨  b^{106, 4}_2
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨  b^{106, 4}_1
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨  p_318 ∨ -b^{106, 4}_0
c  in DIMACS:
-19586  19587 -19588  318  19589 0
-19586  19587 -19588  318  19590 0
-19586  19587 -19588  318 -19591 0

c  -2-1 --> break 
c    ( b^{106, 3}_2 ∧  b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨  b^{106, 3}_0 ∨  p_318 ∨ break
c  in DIMACS:
-19586 -19587  19588  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 3}_2 ∧ -b^{106, 3}_1 ∧ -b^{106, 3}_0 ∧ true) 
c  in CNF:
c    -b^{106, 3}_2 ∨  b^{106, 3}_1 ∨  b^{106, 3}_0 ∨ false 
c  in DIMACS:
-19586  19587  19588  0

c  3 does not represent an automaton state.
c    -(-b^{106, 3}_2 ∧  b^{106, 3}_1 ∧  b^{106, 3}_0 ∧ true) 
c  in CNF:
c     b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ false 
c  in DIMACS:
 19586 -19587 -19588  0
c  -3 does not represent an automaton state.
c    -( b^{106, 3}_2 ∧  b^{106, 3}_1 ∧  b^{106, 3}_0 ∧ true) 
c  in CNF:
c    -b^{106, 3}_2 ∨ -b^{106, 3}_1 ∨ -b^{106, 3}_0 ∨ false 
c  in DIMACS:
-19586 -19587 -19588  0

c i = 4
c  -2+1 --> -1
c    ( b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧  p_424) -> ( b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0)
c  in CNF:
c    -b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨  b^{106, 5}_2
c    -b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_1
c    -b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨  b^{106, 5}_0
c  in DIMACS:
-19589 -19590  19591 -424  19592 0
-19589 -19590  19591 -424 -19593 0
-19589 -19590  19591 -424  19594 0

c  -1+1 --> 0
c    ( b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0 ∧  p_424) -> (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧ -b^{106, 5}_0)
c  in CNF:
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_2
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_1
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_0
c  in DIMACS:
-19589  19590 -19591 -424 -19592 0
-19589  19590 -19591 -424 -19593 0
-19589  19590 -19591 -424 -19594 0

c  0+1 --> 1
c    (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧  p_424) -> (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0)
c  in CNF:
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_2
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_1
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨  b^{106, 5}_0
c  in DIMACS:
 19589  19590  19591 -424 -19592 0
 19589  19590  19591 -424 -19593 0
 19589  19590  19591 -424  19594 0

c  1+1 --> 2
c    (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0 ∧  p_424) -> (-b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0)
c  in CNF:
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_2
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨  b^{106, 5}_1
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ -p_424 ∨ -b^{106, 5}_0
c  in DIMACS:
 19589  19590 -19591 -424 -19592 0
 19589  19590 -19591 -424  19593 0
 19589  19590 -19591 -424 -19594 0

c  2+1 --> break 
c    (-b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧  p_424) -> break
c  in CNF:
c     b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 19589 -19590  19591 -424 1162 0


c  2-1 --> 1
c    (-b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧ -p_424) -> (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0)
c  in CNF:
c     b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_2
c     b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_1
c     b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨  b^{106, 5}_0
c  in DIMACS:
 19589 -19590  19591  424 -19592 0
 19589 -19590  19591  424 -19593 0
 19589 -19590  19591  424  19594 0

c  1-1 --> 0
c    (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0 ∧ -p_424) -> (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧ -b^{106, 5}_0)
c  in CNF:
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_2
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_1
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_0
c  in DIMACS:
 19589  19590 -19591  424 -19592 0
 19589  19590 -19591  424 -19593 0
 19589  19590 -19591  424 -19594 0

c  0-1 --> -1
c    (-b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧ -p_424) -> ( b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0)
c  in CNF:
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨  b^{106, 5}_2
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_1
c     b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨  b^{106, 5}_0
c  in DIMACS:
 19589  19590  19591  424  19592 0
 19589  19590  19591  424 -19593 0
 19589  19590  19591  424  19594 0

c  -1-1 --> -2
c    ( b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧  b^{106, 4}_0 ∧ -p_424) -> ( b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0)
c  in CNF:
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨  b^{106, 5}_2
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨  b^{106, 5}_1
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨  p_424 ∨ -b^{106, 5}_0
c  in DIMACS:
-19589  19590 -19591  424  19592 0
-19589  19590 -19591  424  19593 0
-19589  19590 -19591  424 -19594 0

c  -2-1 --> break 
c    ( b^{106, 4}_2 ∧  b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨  b^{106, 4}_0 ∨  p_424 ∨ break
c  in DIMACS:
-19589 -19590  19591  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 4}_2 ∧ -b^{106, 4}_1 ∧ -b^{106, 4}_0 ∧ true) 
c  in CNF:
c    -b^{106, 4}_2 ∨  b^{106, 4}_1 ∨  b^{106, 4}_0 ∨ false 
c  in DIMACS:
-19589  19590  19591  0

c  3 does not represent an automaton state.
c    -(-b^{106, 4}_2 ∧  b^{106, 4}_1 ∧  b^{106, 4}_0 ∧ true) 
c  in CNF:
c     b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ false 
c  in DIMACS:
 19589 -19590 -19591  0
c  -3 does not represent an automaton state.
c    -( b^{106, 4}_2 ∧  b^{106, 4}_1 ∧  b^{106, 4}_0 ∧ true) 
c  in CNF:
c    -b^{106, 4}_2 ∨ -b^{106, 4}_1 ∨ -b^{106, 4}_0 ∨ false 
c  in DIMACS:
-19589 -19590 -19591  0

c i = 5
c  -2+1 --> -1
c    ( b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧  p_530) -> ( b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0)
c  in CNF:
c    -b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨  b^{106, 6}_2
c    -b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_1
c    -b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨  b^{106, 6}_0
c  in DIMACS:
-19592 -19593  19594 -530  19595 0
-19592 -19593  19594 -530 -19596 0
-19592 -19593  19594 -530  19597 0

c  -1+1 --> 0
c    ( b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0 ∧  p_530) -> (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧ -b^{106, 6}_0)
c  in CNF:
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_2
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_1
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_0
c  in DIMACS:
-19592  19593 -19594 -530 -19595 0
-19592  19593 -19594 -530 -19596 0
-19592  19593 -19594 -530 -19597 0

c  0+1 --> 1
c    (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧  p_530) -> (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0)
c  in CNF:
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_2
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_1
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨  b^{106, 6}_0
c  in DIMACS:
 19592  19593  19594 -530 -19595 0
 19592  19593  19594 -530 -19596 0
 19592  19593  19594 -530  19597 0

c  1+1 --> 2
c    (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0 ∧  p_530) -> (-b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0)
c  in CNF:
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_2
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨  b^{106, 6}_1
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ -p_530 ∨ -b^{106, 6}_0
c  in DIMACS:
 19592  19593 -19594 -530 -19595 0
 19592  19593 -19594 -530  19596 0
 19592  19593 -19594 -530 -19597 0

c  2+1 --> break 
c    (-b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧  p_530) -> break
c  in CNF:
c     b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 19592 -19593  19594 -530 1162 0


c  2-1 --> 1
c    (-b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧ -p_530) -> (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0)
c  in CNF:
c     b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_2
c     b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_1
c     b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨  b^{106, 6}_0
c  in DIMACS:
 19592 -19593  19594  530 -19595 0
 19592 -19593  19594  530 -19596 0
 19592 -19593  19594  530  19597 0

c  1-1 --> 0
c    (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0 ∧ -p_530) -> (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧ -b^{106, 6}_0)
c  in CNF:
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_2
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_1
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_0
c  in DIMACS:
 19592  19593 -19594  530 -19595 0
 19592  19593 -19594  530 -19596 0
 19592  19593 -19594  530 -19597 0

c  0-1 --> -1
c    (-b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧ -p_530) -> ( b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0)
c  in CNF:
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨  b^{106, 6}_2
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_1
c     b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨  b^{106, 6}_0
c  in DIMACS:
 19592  19593  19594  530  19595 0
 19592  19593  19594  530 -19596 0
 19592  19593  19594  530  19597 0

c  -1-1 --> -2
c    ( b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧  b^{106, 5}_0 ∧ -p_530) -> ( b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0)
c  in CNF:
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨  b^{106, 6}_2
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨  b^{106, 6}_1
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨  p_530 ∨ -b^{106, 6}_0
c  in DIMACS:
-19592  19593 -19594  530  19595 0
-19592  19593 -19594  530  19596 0
-19592  19593 -19594  530 -19597 0

c  -2-1 --> break 
c    ( b^{106, 5}_2 ∧  b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨  b^{106, 5}_0 ∨  p_530 ∨ break
c  in DIMACS:
-19592 -19593  19594  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 5}_2 ∧ -b^{106, 5}_1 ∧ -b^{106, 5}_0 ∧ true) 
c  in CNF:
c    -b^{106, 5}_2 ∨  b^{106, 5}_1 ∨  b^{106, 5}_0 ∨ false 
c  in DIMACS:
-19592  19593  19594  0

c  3 does not represent an automaton state.
c    -(-b^{106, 5}_2 ∧  b^{106, 5}_1 ∧  b^{106, 5}_0 ∧ true) 
c  in CNF:
c     b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ false 
c  in DIMACS:
 19592 -19593 -19594  0
c  -3 does not represent an automaton state.
c    -( b^{106, 5}_2 ∧  b^{106, 5}_1 ∧  b^{106, 5}_0 ∧ true) 
c  in CNF:
c    -b^{106, 5}_2 ∨ -b^{106, 5}_1 ∨ -b^{106, 5}_0 ∨ false 
c  in DIMACS:
-19592 -19593 -19594  0

c i = 6
c  -2+1 --> -1
c    ( b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧  p_636) -> ( b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0)
c  in CNF:
c    -b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨  b^{106, 7}_2
c    -b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_1
c    -b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨  b^{106, 7}_0
c  in DIMACS:
-19595 -19596  19597 -636  19598 0
-19595 -19596  19597 -636 -19599 0
-19595 -19596  19597 -636  19600 0

c  -1+1 --> 0
c    ( b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0 ∧  p_636) -> (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧ -b^{106, 7}_0)
c  in CNF:
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_2
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_1
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_0
c  in DIMACS:
-19595  19596 -19597 -636 -19598 0
-19595  19596 -19597 -636 -19599 0
-19595  19596 -19597 -636 -19600 0

c  0+1 --> 1
c    (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧  p_636) -> (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0)
c  in CNF:
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_2
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_1
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨  b^{106, 7}_0
c  in DIMACS:
 19595  19596  19597 -636 -19598 0
 19595  19596  19597 -636 -19599 0
 19595  19596  19597 -636  19600 0

c  1+1 --> 2
c    (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0 ∧  p_636) -> (-b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0)
c  in CNF:
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_2
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨  b^{106, 7}_1
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ -p_636 ∨ -b^{106, 7}_0
c  in DIMACS:
 19595  19596 -19597 -636 -19598 0
 19595  19596 -19597 -636  19599 0
 19595  19596 -19597 -636 -19600 0

c  2+1 --> break 
c    (-b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧  p_636) -> break
c  in CNF:
c     b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 19595 -19596  19597 -636 1162 0


c  2-1 --> 1
c    (-b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧ -p_636) -> (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0)
c  in CNF:
c     b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_2
c     b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_1
c     b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨  b^{106, 7}_0
c  in DIMACS:
 19595 -19596  19597  636 -19598 0
 19595 -19596  19597  636 -19599 0
 19595 -19596  19597  636  19600 0

c  1-1 --> 0
c    (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0 ∧ -p_636) -> (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧ -b^{106, 7}_0)
c  in CNF:
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_2
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_1
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_0
c  in DIMACS:
 19595  19596 -19597  636 -19598 0
 19595  19596 -19597  636 -19599 0
 19595  19596 -19597  636 -19600 0

c  0-1 --> -1
c    (-b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧ -p_636) -> ( b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0)
c  in CNF:
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨  b^{106, 7}_2
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_1
c     b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨  b^{106, 7}_0
c  in DIMACS:
 19595  19596  19597  636  19598 0
 19595  19596  19597  636 -19599 0
 19595  19596  19597  636  19600 0

c  -1-1 --> -2
c    ( b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧  b^{106, 6}_0 ∧ -p_636) -> ( b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0)
c  in CNF:
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨  b^{106, 7}_2
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨  b^{106, 7}_1
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨  p_636 ∨ -b^{106, 7}_0
c  in DIMACS:
-19595  19596 -19597  636  19598 0
-19595  19596 -19597  636  19599 0
-19595  19596 -19597  636 -19600 0

c  -2-1 --> break 
c    ( b^{106, 6}_2 ∧  b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨  b^{106, 6}_0 ∨  p_636 ∨ break
c  in DIMACS:
-19595 -19596  19597  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 6}_2 ∧ -b^{106, 6}_1 ∧ -b^{106, 6}_0 ∧ true) 
c  in CNF:
c    -b^{106, 6}_2 ∨  b^{106, 6}_1 ∨  b^{106, 6}_0 ∨ false 
c  in DIMACS:
-19595  19596  19597  0

c  3 does not represent an automaton state.
c    -(-b^{106, 6}_2 ∧  b^{106, 6}_1 ∧  b^{106, 6}_0 ∧ true) 
c  in CNF:
c     b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ false 
c  in DIMACS:
 19595 -19596 -19597  0
c  -3 does not represent an automaton state.
c    -( b^{106, 6}_2 ∧  b^{106, 6}_1 ∧  b^{106, 6}_0 ∧ true) 
c  in CNF:
c    -b^{106, 6}_2 ∨ -b^{106, 6}_1 ∨ -b^{106, 6}_0 ∨ false 
c  in DIMACS:
-19595 -19596 -19597  0

c i = 7
c  -2+1 --> -1
c    ( b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧  p_742) -> ( b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0)
c  in CNF:
c    -b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨  b^{106, 8}_2
c    -b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_1
c    -b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨  b^{106, 8}_0
c  in DIMACS:
-19598 -19599  19600 -742  19601 0
-19598 -19599  19600 -742 -19602 0
-19598 -19599  19600 -742  19603 0

c  -1+1 --> 0
c    ( b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0 ∧  p_742) -> (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧ -b^{106, 8}_0)
c  in CNF:
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_2
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_1
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_0
c  in DIMACS:
-19598  19599 -19600 -742 -19601 0
-19598  19599 -19600 -742 -19602 0
-19598  19599 -19600 -742 -19603 0

c  0+1 --> 1
c    (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧  p_742) -> (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0)
c  in CNF:
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_2
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_1
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨  b^{106, 8}_0
c  in DIMACS:
 19598  19599  19600 -742 -19601 0
 19598  19599  19600 -742 -19602 0
 19598  19599  19600 -742  19603 0

c  1+1 --> 2
c    (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0 ∧  p_742) -> (-b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0)
c  in CNF:
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_2
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨  b^{106, 8}_1
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ -p_742 ∨ -b^{106, 8}_0
c  in DIMACS:
 19598  19599 -19600 -742 -19601 0
 19598  19599 -19600 -742  19602 0
 19598  19599 -19600 -742 -19603 0

c  2+1 --> break 
c    (-b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧  p_742) -> break
c  in CNF:
c     b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 19598 -19599  19600 -742 1162 0


c  2-1 --> 1
c    (-b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧ -p_742) -> (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0)
c  in CNF:
c     b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_2
c     b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_1
c     b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨  b^{106, 8}_0
c  in DIMACS:
 19598 -19599  19600  742 -19601 0
 19598 -19599  19600  742 -19602 0
 19598 -19599  19600  742  19603 0

c  1-1 --> 0
c    (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0 ∧ -p_742) -> (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧ -b^{106, 8}_0)
c  in CNF:
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_2
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_1
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_0
c  in DIMACS:
 19598  19599 -19600  742 -19601 0
 19598  19599 -19600  742 -19602 0
 19598  19599 -19600  742 -19603 0

c  0-1 --> -1
c    (-b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧ -p_742) -> ( b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0)
c  in CNF:
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨  b^{106, 8}_2
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_1
c     b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨  b^{106, 8}_0
c  in DIMACS:
 19598  19599  19600  742  19601 0
 19598  19599  19600  742 -19602 0
 19598  19599  19600  742  19603 0

c  -1-1 --> -2
c    ( b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧  b^{106, 7}_0 ∧ -p_742) -> ( b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0)
c  in CNF:
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨  b^{106, 8}_2
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨  b^{106, 8}_1
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨  p_742 ∨ -b^{106, 8}_0
c  in DIMACS:
-19598  19599 -19600  742  19601 0
-19598  19599 -19600  742  19602 0
-19598  19599 -19600  742 -19603 0

c  -2-1 --> break 
c    ( b^{106, 7}_2 ∧  b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨  b^{106, 7}_0 ∨  p_742 ∨ break
c  in DIMACS:
-19598 -19599  19600  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 7}_2 ∧ -b^{106, 7}_1 ∧ -b^{106, 7}_0 ∧ true) 
c  in CNF:
c    -b^{106, 7}_2 ∨  b^{106, 7}_1 ∨  b^{106, 7}_0 ∨ false 
c  in DIMACS:
-19598  19599  19600  0

c  3 does not represent an automaton state.
c    -(-b^{106, 7}_2 ∧  b^{106, 7}_1 ∧  b^{106, 7}_0 ∧ true) 
c  in CNF:
c     b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ false 
c  in DIMACS:
 19598 -19599 -19600  0
c  -3 does not represent an automaton state.
c    -( b^{106, 7}_2 ∧  b^{106, 7}_1 ∧  b^{106, 7}_0 ∧ true) 
c  in CNF:
c    -b^{106, 7}_2 ∨ -b^{106, 7}_1 ∨ -b^{106, 7}_0 ∨ false 
c  in DIMACS:
-19598 -19599 -19600  0

c i = 8
c  -2+1 --> -1
c    ( b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧  p_848) -> ( b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0)
c  in CNF:
c    -b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨  b^{106, 9}_2
c    -b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_1
c    -b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨  b^{106, 9}_0
c  in DIMACS:
-19601 -19602  19603 -848  19604 0
-19601 -19602  19603 -848 -19605 0
-19601 -19602  19603 -848  19606 0

c  -1+1 --> 0
c    ( b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0 ∧  p_848) -> (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧ -b^{106, 9}_0)
c  in CNF:
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_2
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_1
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_0
c  in DIMACS:
-19601  19602 -19603 -848 -19604 0
-19601  19602 -19603 -848 -19605 0
-19601  19602 -19603 -848 -19606 0

c  0+1 --> 1
c    (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧  p_848) -> (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0)
c  in CNF:
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_2
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_1
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨  b^{106, 9}_0
c  in DIMACS:
 19601  19602  19603 -848 -19604 0
 19601  19602  19603 -848 -19605 0
 19601  19602  19603 -848  19606 0

c  1+1 --> 2
c    (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0 ∧  p_848) -> (-b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0)
c  in CNF:
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_2
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨  b^{106, 9}_1
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ -p_848 ∨ -b^{106, 9}_0
c  in DIMACS:
 19601  19602 -19603 -848 -19604 0
 19601  19602 -19603 -848  19605 0
 19601  19602 -19603 -848 -19606 0

c  2+1 --> break 
c    (-b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧  p_848) -> break
c  in CNF:
c     b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 19601 -19602  19603 -848 1162 0


c  2-1 --> 1
c    (-b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧ -p_848) -> (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0)
c  in CNF:
c     b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_2
c     b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_1
c     b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨  b^{106, 9}_0
c  in DIMACS:
 19601 -19602  19603  848 -19604 0
 19601 -19602  19603  848 -19605 0
 19601 -19602  19603  848  19606 0

c  1-1 --> 0
c    (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0 ∧ -p_848) -> (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧ -b^{106, 9}_0)
c  in CNF:
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_2
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_1
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_0
c  in DIMACS:
 19601  19602 -19603  848 -19604 0
 19601  19602 -19603  848 -19605 0
 19601  19602 -19603  848 -19606 0

c  0-1 --> -1
c    (-b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧ -p_848) -> ( b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0)
c  in CNF:
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨  b^{106, 9}_2
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_1
c     b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨  b^{106, 9}_0
c  in DIMACS:
 19601  19602  19603  848  19604 0
 19601  19602  19603  848 -19605 0
 19601  19602  19603  848  19606 0

c  -1-1 --> -2
c    ( b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧  b^{106, 8}_0 ∧ -p_848) -> ( b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0)
c  in CNF:
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨  b^{106, 9}_2
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨  b^{106, 9}_1
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨  p_848 ∨ -b^{106, 9}_0
c  in DIMACS:
-19601  19602 -19603  848  19604 0
-19601  19602 -19603  848  19605 0
-19601  19602 -19603  848 -19606 0

c  -2-1 --> break 
c    ( b^{106, 8}_2 ∧  b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨  b^{106, 8}_0 ∨  p_848 ∨ break
c  in DIMACS:
-19601 -19602  19603  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 8}_2 ∧ -b^{106, 8}_1 ∧ -b^{106, 8}_0 ∧ true) 
c  in CNF:
c    -b^{106, 8}_2 ∨  b^{106, 8}_1 ∨  b^{106, 8}_0 ∨ false 
c  in DIMACS:
-19601  19602  19603  0

c  3 does not represent an automaton state.
c    -(-b^{106, 8}_2 ∧  b^{106, 8}_1 ∧  b^{106, 8}_0 ∧ true) 
c  in CNF:
c     b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ false 
c  in DIMACS:
 19601 -19602 -19603  0
c  -3 does not represent an automaton state.
c    -( b^{106, 8}_2 ∧  b^{106, 8}_1 ∧  b^{106, 8}_0 ∧ true) 
c  in CNF:
c    -b^{106, 8}_2 ∨ -b^{106, 8}_1 ∨ -b^{106, 8}_0 ∨ false 
c  in DIMACS:
-19601 -19602 -19603  0

c i = 9
c  -2+1 --> -1
c    ( b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧  p_954) -> ( b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0)
c  in CNF:
c    -b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨  b^{106, 10}_2
c    -b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_1
c    -b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨  b^{106, 10}_0
c  in DIMACS:
-19604 -19605  19606 -954  19607 0
-19604 -19605  19606 -954 -19608 0
-19604 -19605  19606 -954  19609 0

c  -1+1 --> 0
c    ( b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0 ∧  p_954) -> (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧ -b^{106, 10}_0)
c  in CNF:
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_2
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_1
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_0
c  in DIMACS:
-19604  19605 -19606 -954 -19607 0
-19604  19605 -19606 -954 -19608 0
-19604  19605 -19606 -954 -19609 0

c  0+1 --> 1
c    (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧  p_954) -> (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0)
c  in CNF:
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_2
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_1
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨  b^{106, 10}_0
c  in DIMACS:
 19604  19605  19606 -954 -19607 0
 19604  19605  19606 -954 -19608 0
 19604  19605  19606 -954  19609 0

c  1+1 --> 2
c    (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0 ∧  p_954) -> (-b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0)
c  in CNF:
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_2
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨  b^{106, 10}_1
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ -p_954 ∨ -b^{106, 10}_0
c  in DIMACS:
 19604  19605 -19606 -954 -19607 0
 19604  19605 -19606 -954  19608 0
 19604  19605 -19606 -954 -19609 0

c  2+1 --> break 
c    (-b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧  p_954) -> break
c  in CNF:
c     b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 19604 -19605  19606 -954 1162 0


c  2-1 --> 1
c    (-b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧ -p_954) -> (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0)
c  in CNF:
c     b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_2
c     b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_1
c     b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨  b^{106, 10}_0
c  in DIMACS:
 19604 -19605  19606  954 -19607 0
 19604 -19605  19606  954 -19608 0
 19604 -19605  19606  954  19609 0

c  1-1 --> 0
c    (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0 ∧ -p_954) -> (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧ -b^{106, 10}_0)
c  in CNF:
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_2
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_1
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_0
c  in DIMACS:
 19604  19605 -19606  954 -19607 0
 19604  19605 -19606  954 -19608 0
 19604  19605 -19606  954 -19609 0

c  0-1 --> -1
c    (-b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧ -p_954) -> ( b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0)
c  in CNF:
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨  b^{106, 10}_2
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_1
c     b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨  b^{106, 10}_0
c  in DIMACS:
 19604  19605  19606  954  19607 0
 19604  19605  19606  954 -19608 0
 19604  19605  19606  954  19609 0

c  -1-1 --> -2
c    ( b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧  b^{106, 9}_0 ∧ -p_954) -> ( b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0)
c  in CNF:
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨  b^{106, 10}_2
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨  b^{106, 10}_1
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨  p_954 ∨ -b^{106, 10}_0
c  in DIMACS:
-19604  19605 -19606  954  19607 0
-19604  19605 -19606  954  19608 0
-19604  19605 -19606  954 -19609 0

c  -2-1 --> break 
c    ( b^{106, 9}_2 ∧  b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨  b^{106, 9}_0 ∨  p_954 ∨ break
c  in DIMACS:
-19604 -19605  19606  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 9}_2 ∧ -b^{106, 9}_1 ∧ -b^{106, 9}_0 ∧ true) 
c  in CNF:
c    -b^{106, 9}_2 ∨  b^{106, 9}_1 ∨  b^{106, 9}_0 ∨ false 
c  in DIMACS:
-19604  19605  19606  0

c  3 does not represent an automaton state.
c    -(-b^{106, 9}_2 ∧  b^{106, 9}_1 ∧  b^{106, 9}_0 ∧ true) 
c  in CNF:
c     b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ false 
c  in DIMACS:
 19604 -19605 -19606  0
c  -3 does not represent an automaton state.
c    -( b^{106, 9}_2 ∧  b^{106, 9}_1 ∧  b^{106, 9}_0 ∧ true) 
c  in CNF:
c    -b^{106, 9}_2 ∨ -b^{106, 9}_1 ∨ -b^{106, 9}_0 ∨ false 
c  in DIMACS:
-19604 -19605 -19606  0

c i = 10
c  -2+1 --> -1
c    ( b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧  p_1060) -> ( b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧  b^{106, 11}_0)
c  in CNF:
c    -b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨  b^{106, 11}_2
c    -b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_1
c    -b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨  b^{106, 11}_0
c  in DIMACS:
-19607 -19608  19609 -1060  19610 0
-19607 -19608  19609 -1060 -19611 0
-19607 -19608  19609 -1060  19612 0

c  -1+1 --> 0
c    ( b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0 ∧  p_1060) -> (-b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧ -b^{106, 11}_0)
c  in CNF:
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_2
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_1
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_0
c  in DIMACS:
-19607  19608 -19609 -1060 -19610 0
-19607  19608 -19609 -1060 -19611 0
-19607  19608 -19609 -1060 -19612 0

c  0+1 --> 1
c    (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧  p_1060) -> (-b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧  b^{106, 11}_0)
c  in CNF:
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_2
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_1
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨  b^{106, 11}_0
c  in DIMACS:
 19607  19608  19609 -1060 -19610 0
 19607  19608  19609 -1060 -19611 0
 19607  19608  19609 -1060  19612 0

c  1+1 --> 2
c    (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0 ∧  p_1060) -> (-b^{106, 11}_2 ∧  b^{106, 11}_1 ∧ -b^{106, 11}_0)
c  in CNF:
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_2
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨  b^{106, 11}_1
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ -p_1060 ∨ -b^{106, 11}_0
c  in DIMACS:
 19607  19608 -19609 -1060 -19610 0
 19607  19608 -19609 -1060  19611 0
 19607  19608 -19609 -1060 -19612 0

c  2+1 --> break 
c    (-b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 19607 -19608  19609 -1060 1162 0


c  2-1 --> 1
c    (-b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧ -p_1060) -> (-b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧  b^{106, 11}_0)
c  in CNF:
c     b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_2
c     b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_1
c     b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨  b^{106, 11}_0
c  in DIMACS:
 19607 -19608  19609  1060 -19610 0
 19607 -19608  19609  1060 -19611 0
 19607 -19608  19609  1060  19612 0

c  1-1 --> 0
c    (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0 ∧ -p_1060) -> (-b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧ -b^{106, 11}_0)
c  in CNF:
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_2
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_1
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_0
c  in DIMACS:
 19607  19608 -19609  1060 -19610 0
 19607  19608 -19609  1060 -19611 0
 19607  19608 -19609  1060 -19612 0

c  0-1 --> -1
c    (-b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧ -p_1060) -> ( b^{106, 11}_2 ∧ -b^{106, 11}_1 ∧  b^{106, 11}_0)
c  in CNF:
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨  b^{106, 11}_2
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_1
c     b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨  b^{106, 11}_0
c  in DIMACS:
 19607  19608  19609  1060  19610 0
 19607  19608  19609  1060 -19611 0
 19607  19608  19609  1060  19612 0

c  -1-1 --> -2
c    ( b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧  b^{106, 10}_0 ∧ -p_1060) -> ( b^{106, 11}_2 ∧  b^{106, 11}_1 ∧ -b^{106, 11}_0)
c  in CNF:
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨  b^{106, 11}_2
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨  b^{106, 11}_1
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨  p_1060 ∨ -b^{106, 11}_0
c  in DIMACS:
-19607  19608 -19609  1060  19610 0
-19607  19608 -19609  1060  19611 0
-19607  19608 -19609  1060 -19612 0

c  -2-1 --> break 
c    ( b^{106, 10}_2 ∧  b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨  b^{106, 10}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-19607 -19608  19609  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{106, 10}_2 ∧ -b^{106, 10}_1 ∧ -b^{106, 10}_0 ∧ true) 
c  in CNF:
c    -b^{106, 10}_2 ∨  b^{106, 10}_1 ∨  b^{106, 10}_0 ∨ false 
c  in DIMACS:
-19607  19608  19609  0

c  3 does not represent an automaton state.
c    -(-b^{106, 10}_2 ∧  b^{106, 10}_1 ∧  b^{106, 10}_0 ∧ true) 
c  in CNF:
c     b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ false 
c  in DIMACS:
 19607 -19608 -19609  0
c  -3 does not represent an automaton state.
c    -( b^{106, 10}_2 ∧  b^{106, 10}_1 ∧  b^{106, 10}_0 ∧ true) 
c  in CNF:
c    -b^{106, 10}_2 ∨ -b^{106, 10}_1 ∨ -b^{106, 10}_0 ∨ false 
c  in DIMACS:
-19607 -19608 -19609  0

c INIT for k = 107
c    -b^{107, 1}_2
c    -b^{107, 1}_1
c    -b^{107, 1}_0
c  in DIMACS:
-19613 0
-19614 0
-19615 0

c Transitions for k = 107
c i = 1
c  -2+1 --> -1
c    ( b^{107, 1}_2 ∧  b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧  p_107) -> ( b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0)
c  in CNF:
c    -b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨  b^{107, 2}_2
c    -b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_1
c    -b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨  b^{107, 2}_0
c  in DIMACS:
-19613 -19614  19615 -107  19616 0
-19613 -19614  19615 -107 -19617 0
-19613 -19614  19615 -107  19618 0

c  -1+1 --> 0
c    ( b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧  b^{107, 1}_0 ∧  p_107) -> (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧ -b^{107, 2}_0)
c  in CNF:
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_2
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_1
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_0
c  in DIMACS:
-19613  19614 -19615 -107 -19616 0
-19613  19614 -19615 -107 -19617 0
-19613  19614 -19615 -107 -19618 0

c  0+1 --> 1
c    (-b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧  p_107) -> (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0)
c  in CNF:
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_2
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_1
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨  b^{107, 2}_0
c  in DIMACS:
 19613  19614  19615 -107 -19616 0
 19613  19614  19615 -107 -19617 0
 19613  19614  19615 -107  19618 0

c  1+1 --> 2
c    (-b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧  b^{107, 1}_0 ∧  p_107) -> (-b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0)
c  in CNF:
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_2
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨  b^{107, 2}_1
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ -p_107 ∨ -b^{107, 2}_0
c  in DIMACS:
 19613  19614 -19615 -107 -19616 0
 19613  19614 -19615 -107  19617 0
 19613  19614 -19615 -107 -19618 0

c  2+1 --> break 
c    (-b^{107, 1}_2 ∧  b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧  p_107) -> break
c  in CNF:
c     b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ -p_107 ∨ break
c  in DIMACS:
 19613 -19614  19615 -107 1162 0


c  2-1 --> 1
c    (-b^{107, 1}_2 ∧  b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧ -p_107) -> (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0)
c  in CNF:
c     b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_2
c     b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_1
c     b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨  b^{107, 2}_0
c  in DIMACS:
 19613 -19614  19615  107 -19616 0
 19613 -19614  19615  107 -19617 0
 19613 -19614  19615  107  19618 0

c  1-1 --> 0
c    (-b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧  b^{107, 1}_0 ∧ -p_107) -> (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧ -b^{107, 2}_0)
c  in CNF:
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_2
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_1
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_0
c  in DIMACS:
 19613  19614 -19615  107 -19616 0
 19613  19614 -19615  107 -19617 0
 19613  19614 -19615  107 -19618 0

c  0-1 --> -1
c    (-b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧ -p_107) -> ( b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0)
c  in CNF:
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨  b^{107, 2}_2
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_1
c     b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨  b^{107, 2}_0
c  in DIMACS:
 19613  19614  19615  107  19616 0
 19613  19614  19615  107 -19617 0
 19613  19614  19615  107  19618 0

c  -1-1 --> -2
c    ( b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧  b^{107, 1}_0 ∧ -p_107) -> ( b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0)
c  in CNF:
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨  b^{107, 2}_2
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨  b^{107, 2}_1
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨  p_107 ∨ -b^{107, 2}_0
c  in DIMACS:
-19613  19614 -19615  107  19616 0
-19613  19614 -19615  107  19617 0
-19613  19614 -19615  107 -19618 0

c  -2-1 --> break 
c    ( b^{107, 1}_2 ∧  b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧ -p_107) -> break
c  in CNF:
c    -b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨  b^{107, 1}_0 ∨  p_107 ∨ break
c  in DIMACS:
-19613 -19614  19615  107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 1}_2 ∧ -b^{107, 1}_1 ∧ -b^{107, 1}_0 ∧ true) 
c  in CNF:
c    -b^{107, 1}_2 ∨  b^{107, 1}_1 ∨  b^{107, 1}_0 ∨ false 
c  in DIMACS:
-19613  19614  19615  0

c  3 does not represent an automaton state.
c    -(-b^{107, 1}_2 ∧  b^{107, 1}_1 ∧  b^{107, 1}_0 ∧ true) 
c  in CNF:
c     b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ false 
c  in DIMACS:
 19613 -19614 -19615  0
c  -3 does not represent an automaton state.
c    -( b^{107, 1}_2 ∧  b^{107, 1}_1 ∧  b^{107, 1}_0 ∧ true) 
c  in CNF:
c    -b^{107, 1}_2 ∨ -b^{107, 1}_1 ∨ -b^{107, 1}_0 ∨ false 
c  in DIMACS:
-19613 -19614 -19615  0

c i = 2
c  -2+1 --> -1
c    ( b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧  p_214) -> ( b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0)
c  in CNF:
c    -b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨  b^{107, 3}_2
c    -b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_1
c    -b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨  b^{107, 3}_0
c  in DIMACS:
-19616 -19617  19618 -214  19619 0
-19616 -19617  19618 -214 -19620 0
-19616 -19617  19618 -214  19621 0

c  -1+1 --> 0
c    ( b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0 ∧  p_214) -> (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧ -b^{107, 3}_0)
c  in CNF:
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_2
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_1
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_0
c  in DIMACS:
-19616  19617 -19618 -214 -19619 0
-19616  19617 -19618 -214 -19620 0
-19616  19617 -19618 -214 -19621 0

c  0+1 --> 1
c    (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧  p_214) -> (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0)
c  in CNF:
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_2
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_1
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨  b^{107, 3}_0
c  in DIMACS:
 19616  19617  19618 -214 -19619 0
 19616  19617  19618 -214 -19620 0
 19616  19617  19618 -214  19621 0

c  1+1 --> 2
c    (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0 ∧  p_214) -> (-b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0)
c  in CNF:
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_2
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨  b^{107, 3}_1
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ -p_214 ∨ -b^{107, 3}_0
c  in DIMACS:
 19616  19617 -19618 -214 -19619 0
 19616  19617 -19618 -214  19620 0
 19616  19617 -19618 -214 -19621 0

c  2+1 --> break 
c    (-b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧  p_214) -> break
c  in CNF:
c     b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ -p_214 ∨ break
c  in DIMACS:
 19616 -19617  19618 -214 1162 0


c  2-1 --> 1
c    (-b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧ -p_214) -> (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0)
c  in CNF:
c     b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_2
c     b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_1
c     b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨  b^{107, 3}_0
c  in DIMACS:
 19616 -19617  19618  214 -19619 0
 19616 -19617  19618  214 -19620 0
 19616 -19617  19618  214  19621 0

c  1-1 --> 0
c    (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0 ∧ -p_214) -> (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧ -b^{107, 3}_0)
c  in CNF:
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_2
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_1
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_0
c  in DIMACS:
 19616  19617 -19618  214 -19619 0
 19616  19617 -19618  214 -19620 0
 19616  19617 -19618  214 -19621 0

c  0-1 --> -1
c    (-b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧ -p_214) -> ( b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0)
c  in CNF:
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨  b^{107, 3}_2
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_1
c     b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨  b^{107, 3}_0
c  in DIMACS:
 19616  19617  19618  214  19619 0
 19616  19617  19618  214 -19620 0
 19616  19617  19618  214  19621 0

c  -1-1 --> -2
c    ( b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧  b^{107, 2}_0 ∧ -p_214) -> ( b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0)
c  in CNF:
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨  b^{107, 3}_2
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨  b^{107, 3}_1
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨  p_214 ∨ -b^{107, 3}_0
c  in DIMACS:
-19616  19617 -19618  214  19619 0
-19616  19617 -19618  214  19620 0
-19616  19617 -19618  214 -19621 0

c  -2-1 --> break 
c    ( b^{107, 2}_2 ∧  b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧ -p_214) -> break
c  in CNF:
c    -b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨  b^{107, 2}_0 ∨  p_214 ∨ break
c  in DIMACS:
-19616 -19617  19618  214 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 2}_2 ∧ -b^{107, 2}_1 ∧ -b^{107, 2}_0 ∧ true) 
c  in CNF:
c    -b^{107, 2}_2 ∨  b^{107, 2}_1 ∨  b^{107, 2}_0 ∨ false 
c  in DIMACS:
-19616  19617  19618  0

c  3 does not represent an automaton state.
c    -(-b^{107, 2}_2 ∧  b^{107, 2}_1 ∧  b^{107, 2}_0 ∧ true) 
c  in CNF:
c     b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ false 
c  in DIMACS:
 19616 -19617 -19618  0
c  -3 does not represent an automaton state.
c    -( b^{107, 2}_2 ∧  b^{107, 2}_1 ∧  b^{107, 2}_0 ∧ true) 
c  in CNF:
c    -b^{107, 2}_2 ∨ -b^{107, 2}_1 ∨ -b^{107, 2}_0 ∨ false 
c  in DIMACS:
-19616 -19617 -19618  0

c i = 3
c  -2+1 --> -1
c    ( b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧  p_321) -> ( b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0)
c  in CNF:
c    -b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨  b^{107, 4}_2
c    -b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_1
c    -b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨  b^{107, 4}_0
c  in DIMACS:
-19619 -19620  19621 -321  19622 0
-19619 -19620  19621 -321 -19623 0
-19619 -19620  19621 -321  19624 0

c  -1+1 --> 0
c    ( b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0 ∧  p_321) -> (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧ -b^{107, 4}_0)
c  in CNF:
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_2
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_1
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_0
c  in DIMACS:
-19619  19620 -19621 -321 -19622 0
-19619  19620 -19621 -321 -19623 0
-19619  19620 -19621 -321 -19624 0

c  0+1 --> 1
c    (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧  p_321) -> (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0)
c  in CNF:
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_2
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_1
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨  b^{107, 4}_0
c  in DIMACS:
 19619  19620  19621 -321 -19622 0
 19619  19620  19621 -321 -19623 0
 19619  19620  19621 -321  19624 0

c  1+1 --> 2
c    (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0 ∧  p_321) -> (-b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0)
c  in CNF:
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_2
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨  b^{107, 4}_1
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ -p_321 ∨ -b^{107, 4}_0
c  in DIMACS:
 19619  19620 -19621 -321 -19622 0
 19619  19620 -19621 -321  19623 0
 19619  19620 -19621 -321 -19624 0

c  2+1 --> break 
c    (-b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧  p_321) -> break
c  in CNF:
c     b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ -p_321 ∨ break
c  in DIMACS:
 19619 -19620  19621 -321 1162 0


c  2-1 --> 1
c    (-b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧ -p_321) -> (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0)
c  in CNF:
c     b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_2
c     b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_1
c     b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨  b^{107, 4}_0
c  in DIMACS:
 19619 -19620  19621  321 -19622 0
 19619 -19620  19621  321 -19623 0
 19619 -19620  19621  321  19624 0

c  1-1 --> 0
c    (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0 ∧ -p_321) -> (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧ -b^{107, 4}_0)
c  in CNF:
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_2
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_1
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_0
c  in DIMACS:
 19619  19620 -19621  321 -19622 0
 19619  19620 -19621  321 -19623 0
 19619  19620 -19621  321 -19624 0

c  0-1 --> -1
c    (-b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧ -p_321) -> ( b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0)
c  in CNF:
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨  b^{107, 4}_2
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_1
c     b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨  b^{107, 4}_0
c  in DIMACS:
 19619  19620  19621  321  19622 0
 19619  19620  19621  321 -19623 0
 19619  19620  19621  321  19624 0

c  -1-1 --> -2
c    ( b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧  b^{107, 3}_0 ∧ -p_321) -> ( b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0)
c  in CNF:
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨  b^{107, 4}_2
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨  b^{107, 4}_1
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨  p_321 ∨ -b^{107, 4}_0
c  in DIMACS:
-19619  19620 -19621  321  19622 0
-19619  19620 -19621  321  19623 0
-19619  19620 -19621  321 -19624 0

c  -2-1 --> break 
c    ( b^{107, 3}_2 ∧  b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧ -p_321) -> break
c  in CNF:
c    -b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨  b^{107, 3}_0 ∨  p_321 ∨ break
c  in DIMACS:
-19619 -19620  19621  321 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 3}_2 ∧ -b^{107, 3}_1 ∧ -b^{107, 3}_0 ∧ true) 
c  in CNF:
c    -b^{107, 3}_2 ∨  b^{107, 3}_1 ∨  b^{107, 3}_0 ∨ false 
c  in DIMACS:
-19619  19620  19621  0

c  3 does not represent an automaton state.
c    -(-b^{107, 3}_2 ∧  b^{107, 3}_1 ∧  b^{107, 3}_0 ∧ true) 
c  in CNF:
c     b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ false 
c  in DIMACS:
 19619 -19620 -19621  0
c  -3 does not represent an automaton state.
c    -( b^{107, 3}_2 ∧  b^{107, 3}_1 ∧  b^{107, 3}_0 ∧ true) 
c  in CNF:
c    -b^{107, 3}_2 ∨ -b^{107, 3}_1 ∨ -b^{107, 3}_0 ∨ false 
c  in DIMACS:
-19619 -19620 -19621  0

c i = 4
c  -2+1 --> -1
c    ( b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧  p_428) -> ( b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0)
c  in CNF:
c    -b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨  b^{107, 5}_2
c    -b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_1
c    -b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨  b^{107, 5}_0
c  in DIMACS:
-19622 -19623  19624 -428  19625 0
-19622 -19623  19624 -428 -19626 0
-19622 -19623  19624 -428  19627 0

c  -1+1 --> 0
c    ( b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0 ∧  p_428) -> (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧ -b^{107, 5}_0)
c  in CNF:
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_2
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_1
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_0
c  in DIMACS:
-19622  19623 -19624 -428 -19625 0
-19622  19623 -19624 -428 -19626 0
-19622  19623 -19624 -428 -19627 0

c  0+1 --> 1
c    (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧  p_428) -> (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0)
c  in CNF:
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_2
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_1
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨  b^{107, 5}_0
c  in DIMACS:
 19622  19623  19624 -428 -19625 0
 19622  19623  19624 -428 -19626 0
 19622  19623  19624 -428  19627 0

c  1+1 --> 2
c    (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0 ∧  p_428) -> (-b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0)
c  in CNF:
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_2
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨  b^{107, 5}_1
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ -p_428 ∨ -b^{107, 5}_0
c  in DIMACS:
 19622  19623 -19624 -428 -19625 0
 19622  19623 -19624 -428  19626 0
 19622  19623 -19624 -428 -19627 0

c  2+1 --> break 
c    (-b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧  p_428) -> break
c  in CNF:
c     b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ -p_428 ∨ break
c  in DIMACS:
 19622 -19623  19624 -428 1162 0


c  2-1 --> 1
c    (-b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧ -p_428) -> (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0)
c  in CNF:
c     b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_2
c     b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_1
c     b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨  b^{107, 5}_0
c  in DIMACS:
 19622 -19623  19624  428 -19625 0
 19622 -19623  19624  428 -19626 0
 19622 -19623  19624  428  19627 0

c  1-1 --> 0
c    (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0 ∧ -p_428) -> (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧ -b^{107, 5}_0)
c  in CNF:
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_2
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_1
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_0
c  in DIMACS:
 19622  19623 -19624  428 -19625 0
 19622  19623 -19624  428 -19626 0
 19622  19623 -19624  428 -19627 0

c  0-1 --> -1
c    (-b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧ -p_428) -> ( b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0)
c  in CNF:
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨  b^{107, 5}_2
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_1
c     b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨  b^{107, 5}_0
c  in DIMACS:
 19622  19623  19624  428  19625 0
 19622  19623  19624  428 -19626 0
 19622  19623  19624  428  19627 0

c  -1-1 --> -2
c    ( b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧  b^{107, 4}_0 ∧ -p_428) -> ( b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0)
c  in CNF:
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨  b^{107, 5}_2
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨  b^{107, 5}_1
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨  p_428 ∨ -b^{107, 5}_0
c  in DIMACS:
-19622  19623 -19624  428  19625 0
-19622  19623 -19624  428  19626 0
-19622  19623 -19624  428 -19627 0

c  -2-1 --> break 
c    ( b^{107, 4}_2 ∧  b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧ -p_428) -> break
c  in CNF:
c    -b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨  b^{107, 4}_0 ∨  p_428 ∨ break
c  in DIMACS:
-19622 -19623  19624  428 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 4}_2 ∧ -b^{107, 4}_1 ∧ -b^{107, 4}_0 ∧ true) 
c  in CNF:
c    -b^{107, 4}_2 ∨  b^{107, 4}_1 ∨  b^{107, 4}_0 ∨ false 
c  in DIMACS:
-19622  19623  19624  0

c  3 does not represent an automaton state.
c    -(-b^{107, 4}_2 ∧  b^{107, 4}_1 ∧  b^{107, 4}_0 ∧ true) 
c  in CNF:
c     b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ false 
c  in DIMACS:
 19622 -19623 -19624  0
c  -3 does not represent an automaton state.
c    -( b^{107, 4}_2 ∧  b^{107, 4}_1 ∧  b^{107, 4}_0 ∧ true) 
c  in CNF:
c    -b^{107, 4}_2 ∨ -b^{107, 4}_1 ∨ -b^{107, 4}_0 ∨ false 
c  in DIMACS:
-19622 -19623 -19624  0

c i = 5
c  -2+1 --> -1
c    ( b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧  p_535) -> ( b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0)
c  in CNF:
c    -b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨  b^{107, 6}_2
c    -b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_1
c    -b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨  b^{107, 6}_0
c  in DIMACS:
-19625 -19626  19627 -535  19628 0
-19625 -19626  19627 -535 -19629 0
-19625 -19626  19627 -535  19630 0

c  -1+1 --> 0
c    ( b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0 ∧  p_535) -> (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧ -b^{107, 6}_0)
c  in CNF:
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_2
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_1
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_0
c  in DIMACS:
-19625  19626 -19627 -535 -19628 0
-19625  19626 -19627 -535 -19629 0
-19625  19626 -19627 -535 -19630 0

c  0+1 --> 1
c    (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧  p_535) -> (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0)
c  in CNF:
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_2
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_1
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨  b^{107, 6}_0
c  in DIMACS:
 19625  19626  19627 -535 -19628 0
 19625  19626  19627 -535 -19629 0
 19625  19626  19627 -535  19630 0

c  1+1 --> 2
c    (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0 ∧  p_535) -> (-b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0)
c  in CNF:
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_2
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨  b^{107, 6}_1
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ -p_535 ∨ -b^{107, 6}_0
c  in DIMACS:
 19625  19626 -19627 -535 -19628 0
 19625  19626 -19627 -535  19629 0
 19625  19626 -19627 -535 -19630 0

c  2+1 --> break 
c    (-b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧  p_535) -> break
c  in CNF:
c     b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ -p_535 ∨ break
c  in DIMACS:
 19625 -19626  19627 -535 1162 0


c  2-1 --> 1
c    (-b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧ -p_535) -> (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0)
c  in CNF:
c     b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_2
c     b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_1
c     b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨  b^{107, 6}_0
c  in DIMACS:
 19625 -19626  19627  535 -19628 0
 19625 -19626  19627  535 -19629 0
 19625 -19626  19627  535  19630 0

c  1-1 --> 0
c    (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0 ∧ -p_535) -> (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧ -b^{107, 6}_0)
c  in CNF:
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_2
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_1
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_0
c  in DIMACS:
 19625  19626 -19627  535 -19628 0
 19625  19626 -19627  535 -19629 0
 19625  19626 -19627  535 -19630 0

c  0-1 --> -1
c    (-b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧ -p_535) -> ( b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0)
c  in CNF:
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨  b^{107, 6}_2
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_1
c     b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨  b^{107, 6}_0
c  in DIMACS:
 19625  19626  19627  535  19628 0
 19625  19626  19627  535 -19629 0
 19625  19626  19627  535  19630 0

c  -1-1 --> -2
c    ( b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧  b^{107, 5}_0 ∧ -p_535) -> ( b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0)
c  in CNF:
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨  b^{107, 6}_2
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨  b^{107, 6}_1
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨  p_535 ∨ -b^{107, 6}_0
c  in DIMACS:
-19625  19626 -19627  535  19628 0
-19625  19626 -19627  535  19629 0
-19625  19626 -19627  535 -19630 0

c  -2-1 --> break 
c    ( b^{107, 5}_2 ∧  b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧ -p_535) -> break
c  in CNF:
c    -b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨  b^{107, 5}_0 ∨  p_535 ∨ break
c  in DIMACS:
-19625 -19626  19627  535 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 5}_2 ∧ -b^{107, 5}_1 ∧ -b^{107, 5}_0 ∧ true) 
c  in CNF:
c    -b^{107, 5}_2 ∨  b^{107, 5}_1 ∨  b^{107, 5}_0 ∨ false 
c  in DIMACS:
-19625  19626  19627  0

c  3 does not represent an automaton state.
c    -(-b^{107, 5}_2 ∧  b^{107, 5}_1 ∧  b^{107, 5}_0 ∧ true) 
c  in CNF:
c     b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ false 
c  in DIMACS:
 19625 -19626 -19627  0
c  -3 does not represent an automaton state.
c    -( b^{107, 5}_2 ∧  b^{107, 5}_1 ∧  b^{107, 5}_0 ∧ true) 
c  in CNF:
c    -b^{107, 5}_2 ∨ -b^{107, 5}_1 ∨ -b^{107, 5}_0 ∨ false 
c  in DIMACS:
-19625 -19626 -19627  0

c i = 6
c  -2+1 --> -1
c    ( b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧  p_642) -> ( b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0)
c  in CNF:
c    -b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨  b^{107, 7}_2
c    -b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_1
c    -b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨  b^{107, 7}_0
c  in DIMACS:
-19628 -19629  19630 -642  19631 0
-19628 -19629  19630 -642 -19632 0
-19628 -19629  19630 -642  19633 0

c  -1+1 --> 0
c    ( b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0 ∧  p_642) -> (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧ -b^{107, 7}_0)
c  in CNF:
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_2
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_1
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_0
c  in DIMACS:
-19628  19629 -19630 -642 -19631 0
-19628  19629 -19630 -642 -19632 0
-19628  19629 -19630 -642 -19633 0

c  0+1 --> 1
c    (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧  p_642) -> (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0)
c  in CNF:
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_2
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_1
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨  b^{107, 7}_0
c  in DIMACS:
 19628  19629  19630 -642 -19631 0
 19628  19629  19630 -642 -19632 0
 19628  19629  19630 -642  19633 0

c  1+1 --> 2
c    (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0 ∧  p_642) -> (-b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0)
c  in CNF:
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_2
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨  b^{107, 7}_1
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ -p_642 ∨ -b^{107, 7}_0
c  in DIMACS:
 19628  19629 -19630 -642 -19631 0
 19628  19629 -19630 -642  19632 0
 19628  19629 -19630 -642 -19633 0

c  2+1 --> break 
c    (-b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧  p_642) -> break
c  in CNF:
c     b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 19628 -19629  19630 -642 1162 0


c  2-1 --> 1
c    (-b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧ -p_642) -> (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0)
c  in CNF:
c     b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_2
c     b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_1
c     b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨  b^{107, 7}_0
c  in DIMACS:
 19628 -19629  19630  642 -19631 0
 19628 -19629  19630  642 -19632 0
 19628 -19629  19630  642  19633 0

c  1-1 --> 0
c    (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0 ∧ -p_642) -> (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧ -b^{107, 7}_0)
c  in CNF:
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_2
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_1
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_0
c  in DIMACS:
 19628  19629 -19630  642 -19631 0
 19628  19629 -19630  642 -19632 0
 19628  19629 -19630  642 -19633 0

c  0-1 --> -1
c    (-b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧ -p_642) -> ( b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0)
c  in CNF:
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨  b^{107, 7}_2
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_1
c     b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨  b^{107, 7}_0
c  in DIMACS:
 19628  19629  19630  642  19631 0
 19628  19629  19630  642 -19632 0
 19628  19629  19630  642  19633 0

c  -1-1 --> -2
c    ( b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧  b^{107, 6}_0 ∧ -p_642) -> ( b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0)
c  in CNF:
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨  b^{107, 7}_2
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨  b^{107, 7}_1
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨  p_642 ∨ -b^{107, 7}_0
c  in DIMACS:
-19628  19629 -19630  642  19631 0
-19628  19629 -19630  642  19632 0
-19628  19629 -19630  642 -19633 0

c  -2-1 --> break 
c    ( b^{107, 6}_2 ∧  b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨  b^{107, 6}_0 ∨  p_642 ∨ break
c  in DIMACS:
-19628 -19629  19630  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 6}_2 ∧ -b^{107, 6}_1 ∧ -b^{107, 6}_0 ∧ true) 
c  in CNF:
c    -b^{107, 6}_2 ∨  b^{107, 6}_1 ∨  b^{107, 6}_0 ∨ false 
c  in DIMACS:
-19628  19629  19630  0

c  3 does not represent an automaton state.
c    -(-b^{107, 6}_2 ∧  b^{107, 6}_1 ∧  b^{107, 6}_0 ∧ true) 
c  in CNF:
c     b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ false 
c  in DIMACS:
 19628 -19629 -19630  0
c  -3 does not represent an automaton state.
c    -( b^{107, 6}_2 ∧  b^{107, 6}_1 ∧  b^{107, 6}_0 ∧ true) 
c  in CNF:
c    -b^{107, 6}_2 ∨ -b^{107, 6}_1 ∨ -b^{107, 6}_0 ∨ false 
c  in DIMACS:
-19628 -19629 -19630  0

c i = 7
c  -2+1 --> -1
c    ( b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧  p_749) -> ( b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0)
c  in CNF:
c    -b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨  b^{107, 8}_2
c    -b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_1
c    -b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨  b^{107, 8}_0
c  in DIMACS:
-19631 -19632  19633 -749  19634 0
-19631 -19632  19633 -749 -19635 0
-19631 -19632  19633 -749  19636 0

c  -1+1 --> 0
c    ( b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0 ∧  p_749) -> (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧ -b^{107, 8}_0)
c  in CNF:
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_2
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_1
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_0
c  in DIMACS:
-19631  19632 -19633 -749 -19634 0
-19631  19632 -19633 -749 -19635 0
-19631  19632 -19633 -749 -19636 0

c  0+1 --> 1
c    (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧  p_749) -> (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0)
c  in CNF:
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_2
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_1
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨  b^{107, 8}_0
c  in DIMACS:
 19631  19632  19633 -749 -19634 0
 19631  19632  19633 -749 -19635 0
 19631  19632  19633 -749  19636 0

c  1+1 --> 2
c    (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0 ∧  p_749) -> (-b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0)
c  in CNF:
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_2
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨  b^{107, 8}_1
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ -p_749 ∨ -b^{107, 8}_0
c  in DIMACS:
 19631  19632 -19633 -749 -19634 0
 19631  19632 -19633 -749  19635 0
 19631  19632 -19633 -749 -19636 0

c  2+1 --> break 
c    (-b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧  p_749) -> break
c  in CNF:
c     b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ -p_749 ∨ break
c  in DIMACS:
 19631 -19632  19633 -749 1162 0


c  2-1 --> 1
c    (-b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧ -p_749) -> (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0)
c  in CNF:
c     b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_2
c     b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_1
c     b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨  b^{107, 8}_0
c  in DIMACS:
 19631 -19632  19633  749 -19634 0
 19631 -19632  19633  749 -19635 0
 19631 -19632  19633  749  19636 0

c  1-1 --> 0
c    (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0 ∧ -p_749) -> (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧ -b^{107, 8}_0)
c  in CNF:
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_2
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_1
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_0
c  in DIMACS:
 19631  19632 -19633  749 -19634 0
 19631  19632 -19633  749 -19635 0
 19631  19632 -19633  749 -19636 0

c  0-1 --> -1
c    (-b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧ -p_749) -> ( b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0)
c  in CNF:
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨  b^{107, 8}_2
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_1
c     b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨  b^{107, 8}_0
c  in DIMACS:
 19631  19632  19633  749  19634 0
 19631  19632  19633  749 -19635 0
 19631  19632  19633  749  19636 0

c  -1-1 --> -2
c    ( b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧  b^{107, 7}_0 ∧ -p_749) -> ( b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0)
c  in CNF:
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨  b^{107, 8}_2
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨  b^{107, 8}_1
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨  p_749 ∨ -b^{107, 8}_0
c  in DIMACS:
-19631  19632 -19633  749  19634 0
-19631  19632 -19633  749  19635 0
-19631  19632 -19633  749 -19636 0

c  -2-1 --> break 
c    ( b^{107, 7}_2 ∧  b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧ -p_749) -> break
c  in CNF:
c    -b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨  b^{107, 7}_0 ∨  p_749 ∨ break
c  in DIMACS:
-19631 -19632  19633  749 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 7}_2 ∧ -b^{107, 7}_1 ∧ -b^{107, 7}_0 ∧ true) 
c  in CNF:
c    -b^{107, 7}_2 ∨  b^{107, 7}_1 ∨  b^{107, 7}_0 ∨ false 
c  in DIMACS:
-19631  19632  19633  0

c  3 does not represent an automaton state.
c    -(-b^{107, 7}_2 ∧  b^{107, 7}_1 ∧  b^{107, 7}_0 ∧ true) 
c  in CNF:
c     b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ false 
c  in DIMACS:
 19631 -19632 -19633  0
c  -3 does not represent an automaton state.
c    -( b^{107, 7}_2 ∧  b^{107, 7}_1 ∧  b^{107, 7}_0 ∧ true) 
c  in CNF:
c    -b^{107, 7}_2 ∨ -b^{107, 7}_1 ∨ -b^{107, 7}_0 ∨ false 
c  in DIMACS:
-19631 -19632 -19633  0

c i = 8
c  -2+1 --> -1
c    ( b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧  p_856) -> ( b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0)
c  in CNF:
c    -b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨  b^{107, 9}_2
c    -b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_1
c    -b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨  b^{107, 9}_0
c  in DIMACS:
-19634 -19635  19636 -856  19637 0
-19634 -19635  19636 -856 -19638 0
-19634 -19635  19636 -856  19639 0

c  -1+1 --> 0
c    ( b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0 ∧  p_856) -> (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧ -b^{107, 9}_0)
c  in CNF:
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_2
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_1
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_0
c  in DIMACS:
-19634  19635 -19636 -856 -19637 0
-19634  19635 -19636 -856 -19638 0
-19634  19635 -19636 -856 -19639 0

c  0+1 --> 1
c    (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧  p_856) -> (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0)
c  in CNF:
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_2
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_1
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨  b^{107, 9}_0
c  in DIMACS:
 19634  19635  19636 -856 -19637 0
 19634  19635  19636 -856 -19638 0
 19634  19635  19636 -856  19639 0

c  1+1 --> 2
c    (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0 ∧  p_856) -> (-b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0)
c  in CNF:
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_2
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨  b^{107, 9}_1
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ -p_856 ∨ -b^{107, 9}_0
c  in DIMACS:
 19634  19635 -19636 -856 -19637 0
 19634  19635 -19636 -856  19638 0
 19634  19635 -19636 -856 -19639 0

c  2+1 --> break 
c    (-b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧  p_856) -> break
c  in CNF:
c     b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 19634 -19635  19636 -856 1162 0


c  2-1 --> 1
c    (-b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧ -p_856) -> (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0)
c  in CNF:
c     b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_2
c     b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_1
c     b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨  b^{107, 9}_0
c  in DIMACS:
 19634 -19635  19636  856 -19637 0
 19634 -19635  19636  856 -19638 0
 19634 -19635  19636  856  19639 0

c  1-1 --> 0
c    (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0 ∧ -p_856) -> (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧ -b^{107, 9}_0)
c  in CNF:
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_2
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_1
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_0
c  in DIMACS:
 19634  19635 -19636  856 -19637 0
 19634  19635 -19636  856 -19638 0
 19634  19635 -19636  856 -19639 0

c  0-1 --> -1
c    (-b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧ -p_856) -> ( b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0)
c  in CNF:
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨  b^{107, 9}_2
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_1
c     b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨  b^{107, 9}_0
c  in DIMACS:
 19634  19635  19636  856  19637 0
 19634  19635  19636  856 -19638 0
 19634  19635  19636  856  19639 0

c  -1-1 --> -2
c    ( b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧  b^{107, 8}_0 ∧ -p_856) -> ( b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0)
c  in CNF:
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨  b^{107, 9}_2
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨  b^{107, 9}_1
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨  p_856 ∨ -b^{107, 9}_0
c  in DIMACS:
-19634  19635 -19636  856  19637 0
-19634  19635 -19636  856  19638 0
-19634  19635 -19636  856 -19639 0

c  -2-1 --> break 
c    ( b^{107, 8}_2 ∧  b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨  b^{107, 8}_0 ∨  p_856 ∨ break
c  in DIMACS:
-19634 -19635  19636  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 8}_2 ∧ -b^{107, 8}_1 ∧ -b^{107, 8}_0 ∧ true) 
c  in CNF:
c    -b^{107, 8}_2 ∨  b^{107, 8}_1 ∨  b^{107, 8}_0 ∨ false 
c  in DIMACS:
-19634  19635  19636  0

c  3 does not represent an automaton state.
c    -(-b^{107, 8}_2 ∧  b^{107, 8}_1 ∧  b^{107, 8}_0 ∧ true) 
c  in CNF:
c     b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ false 
c  in DIMACS:
 19634 -19635 -19636  0
c  -3 does not represent an automaton state.
c    -( b^{107, 8}_2 ∧  b^{107, 8}_1 ∧  b^{107, 8}_0 ∧ true) 
c  in CNF:
c    -b^{107, 8}_2 ∨ -b^{107, 8}_1 ∨ -b^{107, 8}_0 ∨ false 
c  in DIMACS:
-19634 -19635 -19636  0

c i = 9
c  -2+1 --> -1
c    ( b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧  p_963) -> ( b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0)
c  in CNF:
c    -b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨  b^{107, 10}_2
c    -b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_1
c    -b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨  b^{107, 10}_0
c  in DIMACS:
-19637 -19638  19639 -963  19640 0
-19637 -19638  19639 -963 -19641 0
-19637 -19638  19639 -963  19642 0

c  -1+1 --> 0
c    ( b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0 ∧  p_963) -> (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧ -b^{107, 10}_0)
c  in CNF:
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_2
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_1
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_0
c  in DIMACS:
-19637  19638 -19639 -963 -19640 0
-19637  19638 -19639 -963 -19641 0
-19637  19638 -19639 -963 -19642 0

c  0+1 --> 1
c    (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧  p_963) -> (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0)
c  in CNF:
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_2
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_1
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨  b^{107, 10}_0
c  in DIMACS:
 19637  19638  19639 -963 -19640 0
 19637  19638  19639 -963 -19641 0
 19637  19638  19639 -963  19642 0

c  1+1 --> 2
c    (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0 ∧  p_963) -> (-b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0)
c  in CNF:
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_2
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨  b^{107, 10}_1
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ -p_963 ∨ -b^{107, 10}_0
c  in DIMACS:
 19637  19638 -19639 -963 -19640 0
 19637  19638 -19639 -963  19641 0
 19637  19638 -19639 -963 -19642 0

c  2+1 --> break 
c    (-b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧  p_963) -> break
c  in CNF:
c     b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ -p_963 ∨ break
c  in DIMACS:
 19637 -19638  19639 -963 1162 0


c  2-1 --> 1
c    (-b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧ -p_963) -> (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0)
c  in CNF:
c     b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_2
c     b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_1
c     b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨  b^{107, 10}_0
c  in DIMACS:
 19637 -19638  19639  963 -19640 0
 19637 -19638  19639  963 -19641 0
 19637 -19638  19639  963  19642 0

c  1-1 --> 0
c    (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0 ∧ -p_963) -> (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧ -b^{107, 10}_0)
c  in CNF:
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_2
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_1
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_0
c  in DIMACS:
 19637  19638 -19639  963 -19640 0
 19637  19638 -19639  963 -19641 0
 19637  19638 -19639  963 -19642 0

c  0-1 --> -1
c    (-b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧ -p_963) -> ( b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0)
c  in CNF:
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨  b^{107, 10}_2
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_1
c     b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨  b^{107, 10}_0
c  in DIMACS:
 19637  19638  19639  963  19640 0
 19637  19638  19639  963 -19641 0
 19637  19638  19639  963  19642 0

c  -1-1 --> -2
c    ( b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧  b^{107, 9}_0 ∧ -p_963) -> ( b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0)
c  in CNF:
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨  b^{107, 10}_2
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨  b^{107, 10}_1
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨  p_963 ∨ -b^{107, 10}_0
c  in DIMACS:
-19637  19638 -19639  963  19640 0
-19637  19638 -19639  963  19641 0
-19637  19638 -19639  963 -19642 0

c  -2-1 --> break 
c    ( b^{107, 9}_2 ∧  b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧ -p_963) -> break
c  in CNF:
c    -b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨  b^{107, 9}_0 ∨  p_963 ∨ break
c  in DIMACS:
-19637 -19638  19639  963 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 9}_2 ∧ -b^{107, 9}_1 ∧ -b^{107, 9}_0 ∧ true) 
c  in CNF:
c    -b^{107, 9}_2 ∨  b^{107, 9}_1 ∨  b^{107, 9}_0 ∨ false 
c  in DIMACS:
-19637  19638  19639  0

c  3 does not represent an automaton state.
c    -(-b^{107, 9}_2 ∧  b^{107, 9}_1 ∧  b^{107, 9}_0 ∧ true) 
c  in CNF:
c     b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ false 
c  in DIMACS:
 19637 -19638 -19639  0
c  -3 does not represent an automaton state.
c    -( b^{107, 9}_2 ∧  b^{107, 9}_1 ∧  b^{107, 9}_0 ∧ true) 
c  in CNF:
c    -b^{107, 9}_2 ∨ -b^{107, 9}_1 ∨ -b^{107, 9}_0 ∨ false 
c  in DIMACS:
-19637 -19638 -19639  0

c i = 10
c  -2+1 --> -1
c    ( b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧  p_1070) -> ( b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧  b^{107, 11}_0)
c  in CNF:
c    -b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨  b^{107, 11}_2
c    -b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_1
c    -b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨  b^{107, 11}_0
c  in DIMACS:
-19640 -19641  19642 -1070  19643 0
-19640 -19641  19642 -1070 -19644 0
-19640 -19641  19642 -1070  19645 0

c  -1+1 --> 0
c    ( b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0 ∧  p_1070) -> (-b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧ -b^{107, 11}_0)
c  in CNF:
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_2
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_1
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_0
c  in DIMACS:
-19640  19641 -19642 -1070 -19643 0
-19640  19641 -19642 -1070 -19644 0
-19640  19641 -19642 -1070 -19645 0

c  0+1 --> 1
c    (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧  p_1070) -> (-b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧  b^{107, 11}_0)
c  in CNF:
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_2
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_1
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨  b^{107, 11}_0
c  in DIMACS:
 19640  19641  19642 -1070 -19643 0
 19640  19641  19642 -1070 -19644 0
 19640  19641  19642 -1070  19645 0

c  1+1 --> 2
c    (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0 ∧  p_1070) -> (-b^{107, 11}_2 ∧  b^{107, 11}_1 ∧ -b^{107, 11}_0)
c  in CNF:
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_2
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨  b^{107, 11}_1
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ -p_1070 ∨ -b^{107, 11}_0
c  in DIMACS:
 19640  19641 -19642 -1070 -19643 0
 19640  19641 -19642 -1070  19644 0
 19640  19641 -19642 -1070 -19645 0

c  2+1 --> break 
c    (-b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 19640 -19641  19642 -1070 1162 0


c  2-1 --> 1
c    (-b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧ -p_1070) -> (-b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧  b^{107, 11}_0)
c  in CNF:
c     b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_2
c     b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_1
c     b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨  b^{107, 11}_0
c  in DIMACS:
 19640 -19641  19642  1070 -19643 0
 19640 -19641  19642  1070 -19644 0
 19640 -19641  19642  1070  19645 0

c  1-1 --> 0
c    (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0 ∧ -p_1070) -> (-b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧ -b^{107, 11}_0)
c  in CNF:
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_2
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_1
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_0
c  in DIMACS:
 19640  19641 -19642  1070 -19643 0
 19640  19641 -19642  1070 -19644 0
 19640  19641 -19642  1070 -19645 0

c  0-1 --> -1
c    (-b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧ -p_1070) -> ( b^{107, 11}_2 ∧ -b^{107, 11}_1 ∧  b^{107, 11}_0)
c  in CNF:
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨  b^{107, 11}_2
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_1
c     b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨  b^{107, 11}_0
c  in DIMACS:
 19640  19641  19642  1070  19643 0
 19640  19641  19642  1070 -19644 0
 19640  19641  19642  1070  19645 0

c  -1-1 --> -2
c    ( b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧  b^{107, 10}_0 ∧ -p_1070) -> ( b^{107, 11}_2 ∧  b^{107, 11}_1 ∧ -b^{107, 11}_0)
c  in CNF:
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨  b^{107, 11}_2
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨  b^{107, 11}_1
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨  p_1070 ∨ -b^{107, 11}_0
c  in DIMACS:
-19640  19641 -19642  1070  19643 0
-19640  19641 -19642  1070  19644 0
-19640  19641 -19642  1070 -19645 0

c  -2-1 --> break 
c    ( b^{107, 10}_2 ∧  b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨  b^{107, 10}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-19640 -19641  19642  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{107, 10}_2 ∧ -b^{107, 10}_1 ∧ -b^{107, 10}_0 ∧ true) 
c  in CNF:
c    -b^{107, 10}_2 ∨  b^{107, 10}_1 ∨  b^{107, 10}_0 ∨ false 
c  in DIMACS:
-19640  19641  19642  0

c  3 does not represent an automaton state.
c    -(-b^{107, 10}_2 ∧  b^{107, 10}_1 ∧  b^{107, 10}_0 ∧ true) 
c  in CNF:
c     b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ false 
c  in DIMACS:
 19640 -19641 -19642  0
c  -3 does not represent an automaton state.
c    -( b^{107, 10}_2 ∧  b^{107, 10}_1 ∧  b^{107, 10}_0 ∧ true) 
c  in CNF:
c    -b^{107, 10}_2 ∨ -b^{107, 10}_1 ∨ -b^{107, 10}_0 ∨ false 
c  in DIMACS:
-19640 -19641 -19642  0

c INIT for k = 108
c    -b^{108, 1}_2
c    -b^{108, 1}_1
c    -b^{108, 1}_0
c  in DIMACS:
-19646 0
-19647 0
-19648 0

c Transitions for k = 108
c i = 1
c  -2+1 --> -1
c    ( b^{108, 1}_2 ∧  b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧  p_108) -> ( b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0)
c  in CNF:
c    -b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨  b^{108, 2}_2
c    -b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_1
c    -b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨  b^{108, 2}_0
c  in DIMACS:
-19646 -19647  19648 -108  19649 0
-19646 -19647  19648 -108 -19650 0
-19646 -19647  19648 -108  19651 0

c  -1+1 --> 0
c    ( b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧  b^{108, 1}_0 ∧  p_108) -> (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧ -b^{108, 2}_0)
c  in CNF:
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_2
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_1
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_0
c  in DIMACS:
-19646  19647 -19648 -108 -19649 0
-19646  19647 -19648 -108 -19650 0
-19646  19647 -19648 -108 -19651 0

c  0+1 --> 1
c    (-b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧  p_108) -> (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0)
c  in CNF:
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_2
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_1
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨  b^{108, 2}_0
c  in DIMACS:
 19646  19647  19648 -108 -19649 0
 19646  19647  19648 -108 -19650 0
 19646  19647  19648 -108  19651 0

c  1+1 --> 2
c    (-b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧  b^{108, 1}_0 ∧  p_108) -> (-b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0)
c  in CNF:
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_2
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨  b^{108, 2}_1
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ -p_108 ∨ -b^{108, 2}_0
c  in DIMACS:
 19646  19647 -19648 -108 -19649 0
 19646  19647 -19648 -108  19650 0
 19646  19647 -19648 -108 -19651 0

c  2+1 --> break 
c    (-b^{108, 1}_2 ∧  b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧  p_108) -> break
c  in CNF:
c     b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ -p_108 ∨ break
c  in DIMACS:
 19646 -19647  19648 -108 1162 0


c  2-1 --> 1
c    (-b^{108, 1}_2 ∧  b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧ -p_108) -> (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0)
c  in CNF:
c     b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_2
c     b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_1
c     b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨  b^{108, 2}_0
c  in DIMACS:
 19646 -19647  19648  108 -19649 0
 19646 -19647  19648  108 -19650 0
 19646 -19647  19648  108  19651 0

c  1-1 --> 0
c    (-b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧  b^{108, 1}_0 ∧ -p_108) -> (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧ -b^{108, 2}_0)
c  in CNF:
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_2
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_1
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_0
c  in DIMACS:
 19646  19647 -19648  108 -19649 0
 19646  19647 -19648  108 -19650 0
 19646  19647 -19648  108 -19651 0

c  0-1 --> -1
c    (-b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧ -p_108) -> ( b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0)
c  in CNF:
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨  b^{108, 2}_2
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_1
c     b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨  b^{108, 2}_0
c  in DIMACS:
 19646  19647  19648  108  19649 0
 19646  19647  19648  108 -19650 0
 19646  19647  19648  108  19651 0

c  -1-1 --> -2
c    ( b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧  b^{108, 1}_0 ∧ -p_108) -> ( b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0)
c  in CNF:
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨  b^{108, 2}_2
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨  b^{108, 2}_1
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨  p_108 ∨ -b^{108, 2}_0
c  in DIMACS:
-19646  19647 -19648  108  19649 0
-19646  19647 -19648  108  19650 0
-19646  19647 -19648  108 -19651 0

c  -2-1 --> break 
c    ( b^{108, 1}_2 ∧  b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧ -p_108) -> break
c  in CNF:
c    -b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨  b^{108, 1}_0 ∨  p_108 ∨ break
c  in DIMACS:
-19646 -19647  19648  108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 1}_2 ∧ -b^{108, 1}_1 ∧ -b^{108, 1}_0 ∧ true) 
c  in CNF:
c    -b^{108, 1}_2 ∨  b^{108, 1}_1 ∨  b^{108, 1}_0 ∨ false 
c  in DIMACS:
-19646  19647  19648  0

c  3 does not represent an automaton state.
c    -(-b^{108, 1}_2 ∧  b^{108, 1}_1 ∧  b^{108, 1}_0 ∧ true) 
c  in CNF:
c     b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ false 
c  in DIMACS:
 19646 -19647 -19648  0
c  -3 does not represent an automaton state.
c    -( b^{108, 1}_2 ∧  b^{108, 1}_1 ∧  b^{108, 1}_0 ∧ true) 
c  in CNF:
c    -b^{108, 1}_2 ∨ -b^{108, 1}_1 ∨ -b^{108, 1}_0 ∨ false 
c  in DIMACS:
-19646 -19647 -19648  0

c i = 2
c  -2+1 --> -1
c    ( b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧  p_216) -> ( b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0)
c  in CNF:
c    -b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨  b^{108, 3}_2
c    -b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_1
c    -b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨  b^{108, 3}_0
c  in DIMACS:
-19649 -19650  19651 -216  19652 0
-19649 -19650  19651 -216 -19653 0
-19649 -19650  19651 -216  19654 0

c  -1+1 --> 0
c    ( b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0 ∧  p_216) -> (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧ -b^{108, 3}_0)
c  in CNF:
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_2
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_1
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_0
c  in DIMACS:
-19649  19650 -19651 -216 -19652 0
-19649  19650 -19651 -216 -19653 0
-19649  19650 -19651 -216 -19654 0

c  0+1 --> 1
c    (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧  p_216) -> (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0)
c  in CNF:
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_2
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_1
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨  b^{108, 3}_0
c  in DIMACS:
 19649  19650  19651 -216 -19652 0
 19649  19650  19651 -216 -19653 0
 19649  19650  19651 -216  19654 0

c  1+1 --> 2
c    (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0 ∧  p_216) -> (-b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0)
c  in CNF:
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_2
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨  b^{108, 3}_1
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ -p_216 ∨ -b^{108, 3}_0
c  in DIMACS:
 19649  19650 -19651 -216 -19652 0
 19649  19650 -19651 -216  19653 0
 19649  19650 -19651 -216 -19654 0

c  2+1 --> break 
c    (-b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧  p_216) -> break
c  in CNF:
c     b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 19649 -19650  19651 -216 1162 0


c  2-1 --> 1
c    (-b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧ -p_216) -> (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0)
c  in CNF:
c     b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_2
c     b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_1
c     b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨  b^{108, 3}_0
c  in DIMACS:
 19649 -19650  19651  216 -19652 0
 19649 -19650  19651  216 -19653 0
 19649 -19650  19651  216  19654 0

c  1-1 --> 0
c    (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0 ∧ -p_216) -> (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧ -b^{108, 3}_0)
c  in CNF:
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_2
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_1
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_0
c  in DIMACS:
 19649  19650 -19651  216 -19652 0
 19649  19650 -19651  216 -19653 0
 19649  19650 -19651  216 -19654 0

c  0-1 --> -1
c    (-b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧ -p_216) -> ( b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0)
c  in CNF:
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨  b^{108, 3}_2
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_1
c     b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨  b^{108, 3}_0
c  in DIMACS:
 19649  19650  19651  216  19652 0
 19649  19650  19651  216 -19653 0
 19649  19650  19651  216  19654 0

c  -1-1 --> -2
c    ( b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧  b^{108, 2}_0 ∧ -p_216) -> ( b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0)
c  in CNF:
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨  b^{108, 3}_2
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨  b^{108, 3}_1
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨  p_216 ∨ -b^{108, 3}_0
c  in DIMACS:
-19649  19650 -19651  216  19652 0
-19649  19650 -19651  216  19653 0
-19649  19650 -19651  216 -19654 0

c  -2-1 --> break 
c    ( b^{108, 2}_2 ∧  b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨  b^{108, 2}_0 ∨  p_216 ∨ break
c  in DIMACS:
-19649 -19650  19651  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 2}_2 ∧ -b^{108, 2}_1 ∧ -b^{108, 2}_0 ∧ true) 
c  in CNF:
c    -b^{108, 2}_2 ∨  b^{108, 2}_1 ∨  b^{108, 2}_0 ∨ false 
c  in DIMACS:
-19649  19650  19651  0

c  3 does not represent an automaton state.
c    -(-b^{108, 2}_2 ∧  b^{108, 2}_1 ∧  b^{108, 2}_0 ∧ true) 
c  in CNF:
c     b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ false 
c  in DIMACS:
 19649 -19650 -19651  0
c  -3 does not represent an automaton state.
c    -( b^{108, 2}_2 ∧  b^{108, 2}_1 ∧  b^{108, 2}_0 ∧ true) 
c  in CNF:
c    -b^{108, 2}_2 ∨ -b^{108, 2}_1 ∨ -b^{108, 2}_0 ∨ false 
c  in DIMACS:
-19649 -19650 -19651  0

c i = 3
c  -2+1 --> -1
c    ( b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧  p_324) -> ( b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0)
c  in CNF:
c    -b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨  b^{108, 4}_2
c    -b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_1
c    -b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨  b^{108, 4}_0
c  in DIMACS:
-19652 -19653  19654 -324  19655 0
-19652 -19653  19654 -324 -19656 0
-19652 -19653  19654 -324  19657 0

c  -1+1 --> 0
c    ( b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0 ∧  p_324) -> (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧ -b^{108, 4}_0)
c  in CNF:
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_2
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_1
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_0
c  in DIMACS:
-19652  19653 -19654 -324 -19655 0
-19652  19653 -19654 -324 -19656 0
-19652  19653 -19654 -324 -19657 0

c  0+1 --> 1
c    (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧  p_324) -> (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0)
c  in CNF:
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_2
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_1
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨  b^{108, 4}_0
c  in DIMACS:
 19652  19653  19654 -324 -19655 0
 19652  19653  19654 -324 -19656 0
 19652  19653  19654 -324  19657 0

c  1+1 --> 2
c    (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0 ∧  p_324) -> (-b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0)
c  in CNF:
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_2
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨  b^{108, 4}_1
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ -p_324 ∨ -b^{108, 4}_0
c  in DIMACS:
 19652  19653 -19654 -324 -19655 0
 19652  19653 -19654 -324  19656 0
 19652  19653 -19654 -324 -19657 0

c  2+1 --> break 
c    (-b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧  p_324) -> break
c  in CNF:
c     b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 19652 -19653  19654 -324 1162 0


c  2-1 --> 1
c    (-b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧ -p_324) -> (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0)
c  in CNF:
c     b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_2
c     b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_1
c     b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨  b^{108, 4}_0
c  in DIMACS:
 19652 -19653  19654  324 -19655 0
 19652 -19653  19654  324 -19656 0
 19652 -19653  19654  324  19657 0

c  1-1 --> 0
c    (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0 ∧ -p_324) -> (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧ -b^{108, 4}_0)
c  in CNF:
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_2
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_1
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_0
c  in DIMACS:
 19652  19653 -19654  324 -19655 0
 19652  19653 -19654  324 -19656 0
 19652  19653 -19654  324 -19657 0

c  0-1 --> -1
c    (-b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧ -p_324) -> ( b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0)
c  in CNF:
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨  b^{108, 4}_2
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_1
c     b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨  b^{108, 4}_0
c  in DIMACS:
 19652  19653  19654  324  19655 0
 19652  19653  19654  324 -19656 0
 19652  19653  19654  324  19657 0

c  -1-1 --> -2
c    ( b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧  b^{108, 3}_0 ∧ -p_324) -> ( b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0)
c  in CNF:
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨  b^{108, 4}_2
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨  b^{108, 4}_1
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨  p_324 ∨ -b^{108, 4}_0
c  in DIMACS:
-19652  19653 -19654  324  19655 0
-19652  19653 -19654  324  19656 0
-19652  19653 -19654  324 -19657 0

c  -2-1 --> break 
c    ( b^{108, 3}_2 ∧  b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨  b^{108, 3}_0 ∨  p_324 ∨ break
c  in DIMACS:
-19652 -19653  19654  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 3}_2 ∧ -b^{108, 3}_1 ∧ -b^{108, 3}_0 ∧ true) 
c  in CNF:
c    -b^{108, 3}_2 ∨  b^{108, 3}_1 ∨  b^{108, 3}_0 ∨ false 
c  in DIMACS:
-19652  19653  19654  0

c  3 does not represent an automaton state.
c    -(-b^{108, 3}_2 ∧  b^{108, 3}_1 ∧  b^{108, 3}_0 ∧ true) 
c  in CNF:
c     b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ false 
c  in DIMACS:
 19652 -19653 -19654  0
c  -3 does not represent an automaton state.
c    -( b^{108, 3}_2 ∧  b^{108, 3}_1 ∧  b^{108, 3}_0 ∧ true) 
c  in CNF:
c    -b^{108, 3}_2 ∨ -b^{108, 3}_1 ∨ -b^{108, 3}_0 ∨ false 
c  in DIMACS:
-19652 -19653 -19654  0

c i = 4
c  -2+1 --> -1
c    ( b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧  p_432) -> ( b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0)
c  in CNF:
c    -b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨  b^{108, 5}_2
c    -b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_1
c    -b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨  b^{108, 5}_0
c  in DIMACS:
-19655 -19656  19657 -432  19658 0
-19655 -19656  19657 -432 -19659 0
-19655 -19656  19657 -432  19660 0

c  -1+1 --> 0
c    ( b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0 ∧  p_432) -> (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧ -b^{108, 5}_0)
c  in CNF:
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_2
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_1
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_0
c  in DIMACS:
-19655  19656 -19657 -432 -19658 0
-19655  19656 -19657 -432 -19659 0
-19655  19656 -19657 -432 -19660 0

c  0+1 --> 1
c    (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧  p_432) -> (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0)
c  in CNF:
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_2
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_1
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨  b^{108, 5}_0
c  in DIMACS:
 19655  19656  19657 -432 -19658 0
 19655  19656  19657 -432 -19659 0
 19655  19656  19657 -432  19660 0

c  1+1 --> 2
c    (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0 ∧  p_432) -> (-b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0)
c  in CNF:
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_2
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨  b^{108, 5}_1
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ -p_432 ∨ -b^{108, 5}_0
c  in DIMACS:
 19655  19656 -19657 -432 -19658 0
 19655  19656 -19657 -432  19659 0
 19655  19656 -19657 -432 -19660 0

c  2+1 --> break 
c    (-b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧  p_432) -> break
c  in CNF:
c     b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 19655 -19656  19657 -432 1162 0


c  2-1 --> 1
c    (-b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧ -p_432) -> (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0)
c  in CNF:
c     b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_2
c     b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_1
c     b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨  b^{108, 5}_0
c  in DIMACS:
 19655 -19656  19657  432 -19658 0
 19655 -19656  19657  432 -19659 0
 19655 -19656  19657  432  19660 0

c  1-1 --> 0
c    (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0 ∧ -p_432) -> (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧ -b^{108, 5}_0)
c  in CNF:
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_2
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_1
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_0
c  in DIMACS:
 19655  19656 -19657  432 -19658 0
 19655  19656 -19657  432 -19659 0
 19655  19656 -19657  432 -19660 0

c  0-1 --> -1
c    (-b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧ -p_432) -> ( b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0)
c  in CNF:
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨  b^{108, 5}_2
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_1
c     b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨  b^{108, 5}_0
c  in DIMACS:
 19655  19656  19657  432  19658 0
 19655  19656  19657  432 -19659 0
 19655  19656  19657  432  19660 0

c  -1-1 --> -2
c    ( b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧  b^{108, 4}_0 ∧ -p_432) -> ( b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0)
c  in CNF:
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨  b^{108, 5}_2
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨  b^{108, 5}_1
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨  p_432 ∨ -b^{108, 5}_0
c  in DIMACS:
-19655  19656 -19657  432  19658 0
-19655  19656 -19657  432  19659 0
-19655  19656 -19657  432 -19660 0

c  -2-1 --> break 
c    ( b^{108, 4}_2 ∧  b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨  b^{108, 4}_0 ∨  p_432 ∨ break
c  in DIMACS:
-19655 -19656  19657  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 4}_2 ∧ -b^{108, 4}_1 ∧ -b^{108, 4}_0 ∧ true) 
c  in CNF:
c    -b^{108, 4}_2 ∨  b^{108, 4}_1 ∨  b^{108, 4}_0 ∨ false 
c  in DIMACS:
-19655  19656  19657  0

c  3 does not represent an automaton state.
c    -(-b^{108, 4}_2 ∧  b^{108, 4}_1 ∧  b^{108, 4}_0 ∧ true) 
c  in CNF:
c     b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ false 
c  in DIMACS:
 19655 -19656 -19657  0
c  -3 does not represent an automaton state.
c    -( b^{108, 4}_2 ∧  b^{108, 4}_1 ∧  b^{108, 4}_0 ∧ true) 
c  in CNF:
c    -b^{108, 4}_2 ∨ -b^{108, 4}_1 ∨ -b^{108, 4}_0 ∨ false 
c  in DIMACS:
-19655 -19656 -19657  0

c i = 5
c  -2+1 --> -1
c    ( b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧  p_540) -> ( b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0)
c  in CNF:
c    -b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨  b^{108, 6}_2
c    -b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_1
c    -b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨  b^{108, 6}_0
c  in DIMACS:
-19658 -19659  19660 -540  19661 0
-19658 -19659  19660 -540 -19662 0
-19658 -19659  19660 -540  19663 0

c  -1+1 --> 0
c    ( b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0 ∧  p_540) -> (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧ -b^{108, 6}_0)
c  in CNF:
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_2
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_1
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_0
c  in DIMACS:
-19658  19659 -19660 -540 -19661 0
-19658  19659 -19660 -540 -19662 0
-19658  19659 -19660 -540 -19663 0

c  0+1 --> 1
c    (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧  p_540) -> (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0)
c  in CNF:
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_2
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_1
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨  b^{108, 6}_0
c  in DIMACS:
 19658  19659  19660 -540 -19661 0
 19658  19659  19660 -540 -19662 0
 19658  19659  19660 -540  19663 0

c  1+1 --> 2
c    (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0 ∧  p_540) -> (-b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0)
c  in CNF:
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_2
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨  b^{108, 6}_1
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ -p_540 ∨ -b^{108, 6}_0
c  in DIMACS:
 19658  19659 -19660 -540 -19661 0
 19658  19659 -19660 -540  19662 0
 19658  19659 -19660 -540 -19663 0

c  2+1 --> break 
c    (-b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧  p_540) -> break
c  in CNF:
c     b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 19658 -19659  19660 -540 1162 0


c  2-1 --> 1
c    (-b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧ -p_540) -> (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0)
c  in CNF:
c     b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_2
c     b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_1
c     b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨  b^{108, 6}_0
c  in DIMACS:
 19658 -19659  19660  540 -19661 0
 19658 -19659  19660  540 -19662 0
 19658 -19659  19660  540  19663 0

c  1-1 --> 0
c    (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0 ∧ -p_540) -> (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧ -b^{108, 6}_0)
c  in CNF:
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_2
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_1
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_0
c  in DIMACS:
 19658  19659 -19660  540 -19661 0
 19658  19659 -19660  540 -19662 0
 19658  19659 -19660  540 -19663 0

c  0-1 --> -1
c    (-b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧ -p_540) -> ( b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0)
c  in CNF:
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨  b^{108, 6}_2
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_1
c     b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨  b^{108, 6}_0
c  in DIMACS:
 19658  19659  19660  540  19661 0
 19658  19659  19660  540 -19662 0
 19658  19659  19660  540  19663 0

c  -1-1 --> -2
c    ( b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧  b^{108, 5}_0 ∧ -p_540) -> ( b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0)
c  in CNF:
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨  b^{108, 6}_2
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨  b^{108, 6}_1
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨  p_540 ∨ -b^{108, 6}_0
c  in DIMACS:
-19658  19659 -19660  540  19661 0
-19658  19659 -19660  540  19662 0
-19658  19659 -19660  540 -19663 0

c  -2-1 --> break 
c    ( b^{108, 5}_2 ∧  b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨  b^{108, 5}_0 ∨  p_540 ∨ break
c  in DIMACS:
-19658 -19659  19660  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 5}_2 ∧ -b^{108, 5}_1 ∧ -b^{108, 5}_0 ∧ true) 
c  in CNF:
c    -b^{108, 5}_2 ∨  b^{108, 5}_1 ∨  b^{108, 5}_0 ∨ false 
c  in DIMACS:
-19658  19659  19660  0

c  3 does not represent an automaton state.
c    -(-b^{108, 5}_2 ∧  b^{108, 5}_1 ∧  b^{108, 5}_0 ∧ true) 
c  in CNF:
c     b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ false 
c  in DIMACS:
 19658 -19659 -19660  0
c  -3 does not represent an automaton state.
c    -( b^{108, 5}_2 ∧  b^{108, 5}_1 ∧  b^{108, 5}_0 ∧ true) 
c  in CNF:
c    -b^{108, 5}_2 ∨ -b^{108, 5}_1 ∨ -b^{108, 5}_0 ∨ false 
c  in DIMACS:
-19658 -19659 -19660  0

c i = 6
c  -2+1 --> -1
c    ( b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧  p_648) -> ( b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0)
c  in CNF:
c    -b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨  b^{108, 7}_2
c    -b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_1
c    -b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨  b^{108, 7}_0
c  in DIMACS:
-19661 -19662  19663 -648  19664 0
-19661 -19662  19663 -648 -19665 0
-19661 -19662  19663 -648  19666 0

c  -1+1 --> 0
c    ( b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0 ∧  p_648) -> (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧ -b^{108, 7}_0)
c  in CNF:
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_2
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_1
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_0
c  in DIMACS:
-19661  19662 -19663 -648 -19664 0
-19661  19662 -19663 -648 -19665 0
-19661  19662 -19663 -648 -19666 0

c  0+1 --> 1
c    (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧  p_648) -> (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0)
c  in CNF:
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_2
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_1
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨  b^{108, 7}_0
c  in DIMACS:
 19661  19662  19663 -648 -19664 0
 19661  19662  19663 -648 -19665 0
 19661  19662  19663 -648  19666 0

c  1+1 --> 2
c    (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0 ∧  p_648) -> (-b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0)
c  in CNF:
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_2
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨  b^{108, 7}_1
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ -p_648 ∨ -b^{108, 7}_0
c  in DIMACS:
 19661  19662 -19663 -648 -19664 0
 19661  19662 -19663 -648  19665 0
 19661  19662 -19663 -648 -19666 0

c  2+1 --> break 
c    (-b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧  p_648) -> break
c  in CNF:
c     b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 19661 -19662  19663 -648 1162 0


c  2-1 --> 1
c    (-b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧ -p_648) -> (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0)
c  in CNF:
c     b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_2
c     b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_1
c     b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨  b^{108, 7}_0
c  in DIMACS:
 19661 -19662  19663  648 -19664 0
 19661 -19662  19663  648 -19665 0
 19661 -19662  19663  648  19666 0

c  1-1 --> 0
c    (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0 ∧ -p_648) -> (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧ -b^{108, 7}_0)
c  in CNF:
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_2
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_1
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_0
c  in DIMACS:
 19661  19662 -19663  648 -19664 0
 19661  19662 -19663  648 -19665 0
 19661  19662 -19663  648 -19666 0

c  0-1 --> -1
c    (-b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧ -p_648) -> ( b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0)
c  in CNF:
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨  b^{108, 7}_2
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_1
c     b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨  b^{108, 7}_0
c  in DIMACS:
 19661  19662  19663  648  19664 0
 19661  19662  19663  648 -19665 0
 19661  19662  19663  648  19666 0

c  -1-1 --> -2
c    ( b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧  b^{108, 6}_0 ∧ -p_648) -> ( b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0)
c  in CNF:
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨  b^{108, 7}_2
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨  b^{108, 7}_1
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨  p_648 ∨ -b^{108, 7}_0
c  in DIMACS:
-19661  19662 -19663  648  19664 0
-19661  19662 -19663  648  19665 0
-19661  19662 -19663  648 -19666 0

c  -2-1 --> break 
c    ( b^{108, 6}_2 ∧  b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨  b^{108, 6}_0 ∨  p_648 ∨ break
c  in DIMACS:
-19661 -19662  19663  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 6}_2 ∧ -b^{108, 6}_1 ∧ -b^{108, 6}_0 ∧ true) 
c  in CNF:
c    -b^{108, 6}_2 ∨  b^{108, 6}_1 ∨  b^{108, 6}_0 ∨ false 
c  in DIMACS:
-19661  19662  19663  0

c  3 does not represent an automaton state.
c    -(-b^{108, 6}_2 ∧  b^{108, 6}_1 ∧  b^{108, 6}_0 ∧ true) 
c  in CNF:
c     b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ false 
c  in DIMACS:
 19661 -19662 -19663  0
c  -3 does not represent an automaton state.
c    -( b^{108, 6}_2 ∧  b^{108, 6}_1 ∧  b^{108, 6}_0 ∧ true) 
c  in CNF:
c    -b^{108, 6}_2 ∨ -b^{108, 6}_1 ∨ -b^{108, 6}_0 ∨ false 
c  in DIMACS:
-19661 -19662 -19663  0

c i = 7
c  -2+1 --> -1
c    ( b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧  p_756) -> ( b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0)
c  in CNF:
c    -b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨  b^{108, 8}_2
c    -b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_1
c    -b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨  b^{108, 8}_0
c  in DIMACS:
-19664 -19665  19666 -756  19667 0
-19664 -19665  19666 -756 -19668 0
-19664 -19665  19666 -756  19669 0

c  -1+1 --> 0
c    ( b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0 ∧  p_756) -> (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧ -b^{108, 8}_0)
c  in CNF:
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_2
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_1
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_0
c  in DIMACS:
-19664  19665 -19666 -756 -19667 0
-19664  19665 -19666 -756 -19668 0
-19664  19665 -19666 -756 -19669 0

c  0+1 --> 1
c    (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧  p_756) -> (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0)
c  in CNF:
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_2
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_1
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨  b^{108, 8}_0
c  in DIMACS:
 19664  19665  19666 -756 -19667 0
 19664  19665  19666 -756 -19668 0
 19664  19665  19666 -756  19669 0

c  1+1 --> 2
c    (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0 ∧  p_756) -> (-b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0)
c  in CNF:
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_2
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨  b^{108, 8}_1
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ -p_756 ∨ -b^{108, 8}_0
c  in DIMACS:
 19664  19665 -19666 -756 -19667 0
 19664  19665 -19666 -756  19668 0
 19664  19665 -19666 -756 -19669 0

c  2+1 --> break 
c    (-b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧  p_756) -> break
c  in CNF:
c     b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 19664 -19665  19666 -756 1162 0


c  2-1 --> 1
c    (-b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧ -p_756) -> (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0)
c  in CNF:
c     b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_2
c     b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_1
c     b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨  b^{108, 8}_0
c  in DIMACS:
 19664 -19665  19666  756 -19667 0
 19664 -19665  19666  756 -19668 0
 19664 -19665  19666  756  19669 0

c  1-1 --> 0
c    (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0 ∧ -p_756) -> (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧ -b^{108, 8}_0)
c  in CNF:
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_2
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_1
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_0
c  in DIMACS:
 19664  19665 -19666  756 -19667 0
 19664  19665 -19666  756 -19668 0
 19664  19665 -19666  756 -19669 0

c  0-1 --> -1
c    (-b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧ -p_756) -> ( b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0)
c  in CNF:
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨  b^{108, 8}_2
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_1
c     b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨  b^{108, 8}_0
c  in DIMACS:
 19664  19665  19666  756  19667 0
 19664  19665  19666  756 -19668 0
 19664  19665  19666  756  19669 0

c  -1-1 --> -2
c    ( b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧  b^{108, 7}_0 ∧ -p_756) -> ( b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0)
c  in CNF:
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨  b^{108, 8}_2
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨  b^{108, 8}_1
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨  p_756 ∨ -b^{108, 8}_0
c  in DIMACS:
-19664  19665 -19666  756  19667 0
-19664  19665 -19666  756  19668 0
-19664  19665 -19666  756 -19669 0

c  -2-1 --> break 
c    ( b^{108, 7}_2 ∧  b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨  b^{108, 7}_0 ∨  p_756 ∨ break
c  in DIMACS:
-19664 -19665  19666  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 7}_2 ∧ -b^{108, 7}_1 ∧ -b^{108, 7}_0 ∧ true) 
c  in CNF:
c    -b^{108, 7}_2 ∨  b^{108, 7}_1 ∨  b^{108, 7}_0 ∨ false 
c  in DIMACS:
-19664  19665  19666  0

c  3 does not represent an automaton state.
c    -(-b^{108, 7}_2 ∧  b^{108, 7}_1 ∧  b^{108, 7}_0 ∧ true) 
c  in CNF:
c     b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ false 
c  in DIMACS:
 19664 -19665 -19666  0
c  -3 does not represent an automaton state.
c    -( b^{108, 7}_2 ∧  b^{108, 7}_1 ∧  b^{108, 7}_0 ∧ true) 
c  in CNF:
c    -b^{108, 7}_2 ∨ -b^{108, 7}_1 ∨ -b^{108, 7}_0 ∨ false 
c  in DIMACS:
-19664 -19665 -19666  0

c i = 8
c  -2+1 --> -1
c    ( b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧  p_864) -> ( b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0)
c  in CNF:
c    -b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨  b^{108, 9}_2
c    -b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_1
c    -b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨  b^{108, 9}_0
c  in DIMACS:
-19667 -19668  19669 -864  19670 0
-19667 -19668  19669 -864 -19671 0
-19667 -19668  19669 -864  19672 0

c  -1+1 --> 0
c    ( b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0 ∧  p_864) -> (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧ -b^{108, 9}_0)
c  in CNF:
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_2
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_1
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_0
c  in DIMACS:
-19667  19668 -19669 -864 -19670 0
-19667  19668 -19669 -864 -19671 0
-19667  19668 -19669 -864 -19672 0

c  0+1 --> 1
c    (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧  p_864) -> (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0)
c  in CNF:
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_2
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_1
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨  b^{108, 9}_0
c  in DIMACS:
 19667  19668  19669 -864 -19670 0
 19667  19668  19669 -864 -19671 0
 19667  19668  19669 -864  19672 0

c  1+1 --> 2
c    (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0 ∧  p_864) -> (-b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0)
c  in CNF:
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_2
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨  b^{108, 9}_1
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ -p_864 ∨ -b^{108, 9}_0
c  in DIMACS:
 19667  19668 -19669 -864 -19670 0
 19667  19668 -19669 -864  19671 0
 19667  19668 -19669 -864 -19672 0

c  2+1 --> break 
c    (-b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧  p_864) -> break
c  in CNF:
c     b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 19667 -19668  19669 -864 1162 0


c  2-1 --> 1
c    (-b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧ -p_864) -> (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0)
c  in CNF:
c     b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_2
c     b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_1
c     b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨  b^{108, 9}_0
c  in DIMACS:
 19667 -19668  19669  864 -19670 0
 19667 -19668  19669  864 -19671 0
 19667 -19668  19669  864  19672 0

c  1-1 --> 0
c    (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0 ∧ -p_864) -> (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧ -b^{108, 9}_0)
c  in CNF:
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_2
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_1
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_0
c  in DIMACS:
 19667  19668 -19669  864 -19670 0
 19667  19668 -19669  864 -19671 0
 19667  19668 -19669  864 -19672 0

c  0-1 --> -1
c    (-b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧ -p_864) -> ( b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0)
c  in CNF:
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨  b^{108, 9}_2
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_1
c     b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨  b^{108, 9}_0
c  in DIMACS:
 19667  19668  19669  864  19670 0
 19667  19668  19669  864 -19671 0
 19667  19668  19669  864  19672 0

c  -1-1 --> -2
c    ( b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧  b^{108, 8}_0 ∧ -p_864) -> ( b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0)
c  in CNF:
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨  b^{108, 9}_2
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨  b^{108, 9}_1
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨  p_864 ∨ -b^{108, 9}_0
c  in DIMACS:
-19667  19668 -19669  864  19670 0
-19667  19668 -19669  864  19671 0
-19667  19668 -19669  864 -19672 0

c  -2-1 --> break 
c    ( b^{108, 8}_2 ∧  b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨  b^{108, 8}_0 ∨  p_864 ∨ break
c  in DIMACS:
-19667 -19668  19669  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 8}_2 ∧ -b^{108, 8}_1 ∧ -b^{108, 8}_0 ∧ true) 
c  in CNF:
c    -b^{108, 8}_2 ∨  b^{108, 8}_1 ∨  b^{108, 8}_0 ∨ false 
c  in DIMACS:
-19667  19668  19669  0

c  3 does not represent an automaton state.
c    -(-b^{108, 8}_2 ∧  b^{108, 8}_1 ∧  b^{108, 8}_0 ∧ true) 
c  in CNF:
c     b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ false 
c  in DIMACS:
 19667 -19668 -19669  0
c  -3 does not represent an automaton state.
c    -( b^{108, 8}_2 ∧  b^{108, 8}_1 ∧  b^{108, 8}_0 ∧ true) 
c  in CNF:
c    -b^{108, 8}_2 ∨ -b^{108, 8}_1 ∨ -b^{108, 8}_0 ∨ false 
c  in DIMACS:
-19667 -19668 -19669  0

c i = 9
c  -2+1 --> -1
c    ( b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧  p_972) -> ( b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0)
c  in CNF:
c    -b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨  b^{108, 10}_2
c    -b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_1
c    -b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨  b^{108, 10}_0
c  in DIMACS:
-19670 -19671  19672 -972  19673 0
-19670 -19671  19672 -972 -19674 0
-19670 -19671  19672 -972  19675 0

c  -1+1 --> 0
c    ( b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0 ∧  p_972) -> (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧ -b^{108, 10}_0)
c  in CNF:
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_2
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_1
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_0
c  in DIMACS:
-19670  19671 -19672 -972 -19673 0
-19670  19671 -19672 -972 -19674 0
-19670  19671 -19672 -972 -19675 0

c  0+1 --> 1
c    (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧  p_972) -> (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0)
c  in CNF:
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_2
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_1
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨  b^{108, 10}_0
c  in DIMACS:
 19670  19671  19672 -972 -19673 0
 19670  19671  19672 -972 -19674 0
 19670  19671  19672 -972  19675 0

c  1+1 --> 2
c    (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0 ∧  p_972) -> (-b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0)
c  in CNF:
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_2
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨  b^{108, 10}_1
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ -p_972 ∨ -b^{108, 10}_0
c  in DIMACS:
 19670  19671 -19672 -972 -19673 0
 19670  19671 -19672 -972  19674 0
 19670  19671 -19672 -972 -19675 0

c  2+1 --> break 
c    (-b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧  p_972) -> break
c  in CNF:
c     b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 19670 -19671  19672 -972 1162 0


c  2-1 --> 1
c    (-b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧ -p_972) -> (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0)
c  in CNF:
c     b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_2
c     b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_1
c     b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨  b^{108, 10}_0
c  in DIMACS:
 19670 -19671  19672  972 -19673 0
 19670 -19671  19672  972 -19674 0
 19670 -19671  19672  972  19675 0

c  1-1 --> 0
c    (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0 ∧ -p_972) -> (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧ -b^{108, 10}_0)
c  in CNF:
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_2
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_1
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_0
c  in DIMACS:
 19670  19671 -19672  972 -19673 0
 19670  19671 -19672  972 -19674 0
 19670  19671 -19672  972 -19675 0

c  0-1 --> -1
c    (-b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧ -p_972) -> ( b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0)
c  in CNF:
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨  b^{108, 10}_2
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_1
c     b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨  b^{108, 10}_0
c  in DIMACS:
 19670  19671  19672  972  19673 0
 19670  19671  19672  972 -19674 0
 19670  19671  19672  972  19675 0

c  -1-1 --> -2
c    ( b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧  b^{108, 9}_0 ∧ -p_972) -> ( b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0)
c  in CNF:
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨  b^{108, 10}_2
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨  b^{108, 10}_1
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨  p_972 ∨ -b^{108, 10}_0
c  in DIMACS:
-19670  19671 -19672  972  19673 0
-19670  19671 -19672  972  19674 0
-19670  19671 -19672  972 -19675 0

c  -2-1 --> break 
c    ( b^{108, 9}_2 ∧  b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨  b^{108, 9}_0 ∨  p_972 ∨ break
c  in DIMACS:
-19670 -19671  19672  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 9}_2 ∧ -b^{108, 9}_1 ∧ -b^{108, 9}_0 ∧ true) 
c  in CNF:
c    -b^{108, 9}_2 ∨  b^{108, 9}_1 ∨  b^{108, 9}_0 ∨ false 
c  in DIMACS:
-19670  19671  19672  0

c  3 does not represent an automaton state.
c    -(-b^{108, 9}_2 ∧  b^{108, 9}_1 ∧  b^{108, 9}_0 ∧ true) 
c  in CNF:
c     b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ false 
c  in DIMACS:
 19670 -19671 -19672  0
c  -3 does not represent an automaton state.
c    -( b^{108, 9}_2 ∧  b^{108, 9}_1 ∧  b^{108, 9}_0 ∧ true) 
c  in CNF:
c    -b^{108, 9}_2 ∨ -b^{108, 9}_1 ∨ -b^{108, 9}_0 ∨ false 
c  in DIMACS:
-19670 -19671 -19672  0

c i = 10
c  -2+1 --> -1
c    ( b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧  p_1080) -> ( b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧  b^{108, 11}_0)
c  in CNF:
c    -b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨  b^{108, 11}_2
c    -b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_1
c    -b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨  b^{108, 11}_0
c  in DIMACS:
-19673 -19674  19675 -1080  19676 0
-19673 -19674  19675 -1080 -19677 0
-19673 -19674  19675 -1080  19678 0

c  -1+1 --> 0
c    ( b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0 ∧  p_1080) -> (-b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧ -b^{108, 11}_0)
c  in CNF:
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_2
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_1
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_0
c  in DIMACS:
-19673  19674 -19675 -1080 -19676 0
-19673  19674 -19675 -1080 -19677 0
-19673  19674 -19675 -1080 -19678 0

c  0+1 --> 1
c    (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧  p_1080) -> (-b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧  b^{108, 11}_0)
c  in CNF:
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_2
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_1
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨  b^{108, 11}_0
c  in DIMACS:
 19673  19674  19675 -1080 -19676 0
 19673  19674  19675 -1080 -19677 0
 19673  19674  19675 -1080  19678 0

c  1+1 --> 2
c    (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0 ∧  p_1080) -> (-b^{108, 11}_2 ∧  b^{108, 11}_1 ∧ -b^{108, 11}_0)
c  in CNF:
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_2
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨  b^{108, 11}_1
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ -p_1080 ∨ -b^{108, 11}_0
c  in DIMACS:
 19673  19674 -19675 -1080 -19676 0
 19673  19674 -19675 -1080  19677 0
 19673  19674 -19675 -1080 -19678 0

c  2+1 --> break 
c    (-b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 19673 -19674  19675 -1080 1162 0


c  2-1 --> 1
c    (-b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧ -p_1080) -> (-b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧  b^{108, 11}_0)
c  in CNF:
c     b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_2
c     b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_1
c     b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨  b^{108, 11}_0
c  in DIMACS:
 19673 -19674  19675  1080 -19676 0
 19673 -19674  19675  1080 -19677 0
 19673 -19674  19675  1080  19678 0

c  1-1 --> 0
c    (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0 ∧ -p_1080) -> (-b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧ -b^{108, 11}_0)
c  in CNF:
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_2
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_1
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_0
c  in DIMACS:
 19673  19674 -19675  1080 -19676 0
 19673  19674 -19675  1080 -19677 0
 19673  19674 -19675  1080 -19678 0

c  0-1 --> -1
c    (-b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧ -p_1080) -> ( b^{108, 11}_2 ∧ -b^{108, 11}_1 ∧  b^{108, 11}_0)
c  in CNF:
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨  b^{108, 11}_2
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_1
c     b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨  b^{108, 11}_0
c  in DIMACS:
 19673  19674  19675  1080  19676 0
 19673  19674  19675  1080 -19677 0
 19673  19674  19675  1080  19678 0

c  -1-1 --> -2
c    ( b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧  b^{108, 10}_0 ∧ -p_1080) -> ( b^{108, 11}_2 ∧  b^{108, 11}_1 ∧ -b^{108, 11}_0)
c  in CNF:
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨  b^{108, 11}_2
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨  b^{108, 11}_1
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨  p_1080 ∨ -b^{108, 11}_0
c  in DIMACS:
-19673  19674 -19675  1080  19676 0
-19673  19674 -19675  1080  19677 0
-19673  19674 -19675  1080 -19678 0

c  -2-1 --> break 
c    ( b^{108, 10}_2 ∧  b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨  b^{108, 10}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-19673 -19674  19675  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{108, 10}_2 ∧ -b^{108, 10}_1 ∧ -b^{108, 10}_0 ∧ true) 
c  in CNF:
c    -b^{108, 10}_2 ∨  b^{108, 10}_1 ∨  b^{108, 10}_0 ∨ false 
c  in DIMACS:
-19673  19674  19675  0

c  3 does not represent an automaton state.
c    -(-b^{108, 10}_2 ∧  b^{108, 10}_1 ∧  b^{108, 10}_0 ∧ true) 
c  in CNF:
c     b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ false 
c  in DIMACS:
 19673 -19674 -19675  0
c  -3 does not represent an automaton state.
c    -( b^{108, 10}_2 ∧  b^{108, 10}_1 ∧  b^{108, 10}_0 ∧ true) 
c  in CNF:
c    -b^{108, 10}_2 ∨ -b^{108, 10}_1 ∨ -b^{108, 10}_0 ∨ false 
c  in DIMACS:
-19673 -19674 -19675  0

c INIT for k = 109
c    -b^{109, 1}_2
c    -b^{109, 1}_1
c    -b^{109, 1}_0
c  in DIMACS:
-19679 0
-19680 0
-19681 0

c Transitions for k = 109
c i = 1
c  -2+1 --> -1
c    ( b^{109, 1}_2 ∧  b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧  p_109) -> ( b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0)
c  in CNF:
c    -b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨  b^{109, 2}_2
c    -b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_1
c    -b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨  b^{109, 2}_0
c  in DIMACS:
-19679 -19680  19681 -109  19682 0
-19679 -19680  19681 -109 -19683 0
-19679 -19680  19681 -109  19684 0

c  -1+1 --> 0
c    ( b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧  b^{109, 1}_0 ∧  p_109) -> (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧ -b^{109, 2}_0)
c  in CNF:
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_2
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_1
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_0
c  in DIMACS:
-19679  19680 -19681 -109 -19682 0
-19679  19680 -19681 -109 -19683 0
-19679  19680 -19681 -109 -19684 0

c  0+1 --> 1
c    (-b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧  p_109) -> (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0)
c  in CNF:
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_2
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_1
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨  b^{109, 2}_0
c  in DIMACS:
 19679  19680  19681 -109 -19682 0
 19679  19680  19681 -109 -19683 0
 19679  19680  19681 -109  19684 0

c  1+1 --> 2
c    (-b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧  b^{109, 1}_0 ∧  p_109) -> (-b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0)
c  in CNF:
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_2
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨  b^{109, 2}_1
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ -p_109 ∨ -b^{109, 2}_0
c  in DIMACS:
 19679  19680 -19681 -109 -19682 0
 19679  19680 -19681 -109  19683 0
 19679  19680 -19681 -109 -19684 0

c  2+1 --> break 
c    (-b^{109, 1}_2 ∧  b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧  p_109) -> break
c  in CNF:
c     b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ -p_109 ∨ break
c  in DIMACS:
 19679 -19680  19681 -109 1162 0


c  2-1 --> 1
c    (-b^{109, 1}_2 ∧  b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧ -p_109) -> (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0)
c  in CNF:
c     b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_2
c     b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_1
c     b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨  b^{109, 2}_0
c  in DIMACS:
 19679 -19680  19681  109 -19682 0
 19679 -19680  19681  109 -19683 0
 19679 -19680  19681  109  19684 0

c  1-1 --> 0
c    (-b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧  b^{109, 1}_0 ∧ -p_109) -> (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧ -b^{109, 2}_0)
c  in CNF:
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_2
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_1
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_0
c  in DIMACS:
 19679  19680 -19681  109 -19682 0
 19679  19680 -19681  109 -19683 0
 19679  19680 -19681  109 -19684 0

c  0-1 --> -1
c    (-b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧ -p_109) -> ( b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0)
c  in CNF:
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨  b^{109, 2}_2
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_1
c     b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨  b^{109, 2}_0
c  in DIMACS:
 19679  19680  19681  109  19682 0
 19679  19680  19681  109 -19683 0
 19679  19680  19681  109  19684 0

c  -1-1 --> -2
c    ( b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧  b^{109, 1}_0 ∧ -p_109) -> ( b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0)
c  in CNF:
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨  b^{109, 2}_2
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨  b^{109, 2}_1
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨  p_109 ∨ -b^{109, 2}_0
c  in DIMACS:
-19679  19680 -19681  109  19682 0
-19679  19680 -19681  109  19683 0
-19679  19680 -19681  109 -19684 0

c  -2-1 --> break 
c    ( b^{109, 1}_2 ∧  b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧ -p_109) -> break
c  in CNF:
c    -b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨  b^{109, 1}_0 ∨  p_109 ∨ break
c  in DIMACS:
-19679 -19680  19681  109 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 1}_2 ∧ -b^{109, 1}_1 ∧ -b^{109, 1}_0 ∧ true) 
c  in CNF:
c    -b^{109, 1}_2 ∨  b^{109, 1}_1 ∨  b^{109, 1}_0 ∨ false 
c  in DIMACS:
-19679  19680  19681  0

c  3 does not represent an automaton state.
c    -(-b^{109, 1}_2 ∧  b^{109, 1}_1 ∧  b^{109, 1}_0 ∧ true) 
c  in CNF:
c     b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ false 
c  in DIMACS:
 19679 -19680 -19681  0
c  -3 does not represent an automaton state.
c    -( b^{109, 1}_2 ∧  b^{109, 1}_1 ∧  b^{109, 1}_0 ∧ true) 
c  in CNF:
c    -b^{109, 1}_2 ∨ -b^{109, 1}_1 ∨ -b^{109, 1}_0 ∨ false 
c  in DIMACS:
-19679 -19680 -19681  0

c i = 2
c  -2+1 --> -1
c    ( b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧  p_218) -> ( b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0)
c  in CNF:
c    -b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨  b^{109, 3}_2
c    -b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_1
c    -b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨  b^{109, 3}_0
c  in DIMACS:
-19682 -19683  19684 -218  19685 0
-19682 -19683  19684 -218 -19686 0
-19682 -19683  19684 -218  19687 0

c  -1+1 --> 0
c    ( b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0 ∧  p_218) -> (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧ -b^{109, 3}_0)
c  in CNF:
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_2
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_1
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_0
c  in DIMACS:
-19682  19683 -19684 -218 -19685 0
-19682  19683 -19684 -218 -19686 0
-19682  19683 -19684 -218 -19687 0

c  0+1 --> 1
c    (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧  p_218) -> (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0)
c  in CNF:
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_2
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_1
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨  b^{109, 3}_0
c  in DIMACS:
 19682  19683  19684 -218 -19685 0
 19682  19683  19684 -218 -19686 0
 19682  19683  19684 -218  19687 0

c  1+1 --> 2
c    (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0 ∧  p_218) -> (-b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0)
c  in CNF:
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_2
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨  b^{109, 3}_1
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ -p_218 ∨ -b^{109, 3}_0
c  in DIMACS:
 19682  19683 -19684 -218 -19685 0
 19682  19683 -19684 -218  19686 0
 19682  19683 -19684 -218 -19687 0

c  2+1 --> break 
c    (-b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧  p_218) -> break
c  in CNF:
c     b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ -p_218 ∨ break
c  in DIMACS:
 19682 -19683  19684 -218 1162 0


c  2-1 --> 1
c    (-b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧ -p_218) -> (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0)
c  in CNF:
c     b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_2
c     b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_1
c     b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨  b^{109, 3}_0
c  in DIMACS:
 19682 -19683  19684  218 -19685 0
 19682 -19683  19684  218 -19686 0
 19682 -19683  19684  218  19687 0

c  1-1 --> 0
c    (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0 ∧ -p_218) -> (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧ -b^{109, 3}_0)
c  in CNF:
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_2
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_1
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_0
c  in DIMACS:
 19682  19683 -19684  218 -19685 0
 19682  19683 -19684  218 -19686 0
 19682  19683 -19684  218 -19687 0

c  0-1 --> -1
c    (-b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧ -p_218) -> ( b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0)
c  in CNF:
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨  b^{109, 3}_2
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_1
c     b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨  b^{109, 3}_0
c  in DIMACS:
 19682  19683  19684  218  19685 0
 19682  19683  19684  218 -19686 0
 19682  19683  19684  218  19687 0

c  -1-1 --> -2
c    ( b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧  b^{109, 2}_0 ∧ -p_218) -> ( b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0)
c  in CNF:
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨  b^{109, 3}_2
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨  b^{109, 3}_1
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨  p_218 ∨ -b^{109, 3}_0
c  in DIMACS:
-19682  19683 -19684  218  19685 0
-19682  19683 -19684  218  19686 0
-19682  19683 -19684  218 -19687 0

c  -2-1 --> break 
c    ( b^{109, 2}_2 ∧  b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧ -p_218) -> break
c  in CNF:
c    -b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨  b^{109, 2}_0 ∨  p_218 ∨ break
c  in DIMACS:
-19682 -19683  19684  218 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 2}_2 ∧ -b^{109, 2}_1 ∧ -b^{109, 2}_0 ∧ true) 
c  in CNF:
c    -b^{109, 2}_2 ∨  b^{109, 2}_1 ∨  b^{109, 2}_0 ∨ false 
c  in DIMACS:
-19682  19683  19684  0

c  3 does not represent an automaton state.
c    -(-b^{109, 2}_2 ∧  b^{109, 2}_1 ∧  b^{109, 2}_0 ∧ true) 
c  in CNF:
c     b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ false 
c  in DIMACS:
 19682 -19683 -19684  0
c  -3 does not represent an automaton state.
c    -( b^{109, 2}_2 ∧  b^{109, 2}_1 ∧  b^{109, 2}_0 ∧ true) 
c  in CNF:
c    -b^{109, 2}_2 ∨ -b^{109, 2}_1 ∨ -b^{109, 2}_0 ∨ false 
c  in DIMACS:
-19682 -19683 -19684  0

c i = 3
c  -2+1 --> -1
c    ( b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧  p_327) -> ( b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0)
c  in CNF:
c    -b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨  b^{109, 4}_2
c    -b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_1
c    -b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨  b^{109, 4}_0
c  in DIMACS:
-19685 -19686  19687 -327  19688 0
-19685 -19686  19687 -327 -19689 0
-19685 -19686  19687 -327  19690 0

c  -1+1 --> 0
c    ( b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0 ∧  p_327) -> (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧ -b^{109, 4}_0)
c  in CNF:
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_2
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_1
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_0
c  in DIMACS:
-19685  19686 -19687 -327 -19688 0
-19685  19686 -19687 -327 -19689 0
-19685  19686 -19687 -327 -19690 0

c  0+1 --> 1
c    (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧  p_327) -> (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0)
c  in CNF:
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_2
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_1
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨  b^{109, 4}_0
c  in DIMACS:
 19685  19686  19687 -327 -19688 0
 19685  19686  19687 -327 -19689 0
 19685  19686  19687 -327  19690 0

c  1+1 --> 2
c    (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0 ∧  p_327) -> (-b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0)
c  in CNF:
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_2
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨  b^{109, 4}_1
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ -p_327 ∨ -b^{109, 4}_0
c  in DIMACS:
 19685  19686 -19687 -327 -19688 0
 19685  19686 -19687 -327  19689 0
 19685  19686 -19687 -327 -19690 0

c  2+1 --> break 
c    (-b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧  p_327) -> break
c  in CNF:
c     b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ -p_327 ∨ break
c  in DIMACS:
 19685 -19686  19687 -327 1162 0


c  2-1 --> 1
c    (-b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧ -p_327) -> (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0)
c  in CNF:
c     b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_2
c     b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_1
c     b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨  b^{109, 4}_0
c  in DIMACS:
 19685 -19686  19687  327 -19688 0
 19685 -19686  19687  327 -19689 0
 19685 -19686  19687  327  19690 0

c  1-1 --> 0
c    (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0 ∧ -p_327) -> (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧ -b^{109, 4}_0)
c  in CNF:
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_2
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_1
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_0
c  in DIMACS:
 19685  19686 -19687  327 -19688 0
 19685  19686 -19687  327 -19689 0
 19685  19686 -19687  327 -19690 0

c  0-1 --> -1
c    (-b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧ -p_327) -> ( b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0)
c  in CNF:
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨  b^{109, 4}_2
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_1
c     b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨  b^{109, 4}_0
c  in DIMACS:
 19685  19686  19687  327  19688 0
 19685  19686  19687  327 -19689 0
 19685  19686  19687  327  19690 0

c  -1-1 --> -2
c    ( b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧  b^{109, 3}_0 ∧ -p_327) -> ( b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0)
c  in CNF:
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨  b^{109, 4}_2
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨  b^{109, 4}_1
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨  p_327 ∨ -b^{109, 4}_0
c  in DIMACS:
-19685  19686 -19687  327  19688 0
-19685  19686 -19687  327  19689 0
-19685  19686 -19687  327 -19690 0

c  -2-1 --> break 
c    ( b^{109, 3}_2 ∧  b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧ -p_327) -> break
c  in CNF:
c    -b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨  b^{109, 3}_0 ∨  p_327 ∨ break
c  in DIMACS:
-19685 -19686  19687  327 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 3}_2 ∧ -b^{109, 3}_1 ∧ -b^{109, 3}_0 ∧ true) 
c  in CNF:
c    -b^{109, 3}_2 ∨  b^{109, 3}_1 ∨  b^{109, 3}_0 ∨ false 
c  in DIMACS:
-19685  19686  19687  0

c  3 does not represent an automaton state.
c    -(-b^{109, 3}_2 ∧  b^{109, 3}_1 ∧  b^{109, 3}_0 ∧ true) 
c  in CNF:
c     b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ false 
c  in DIMACS:
 19685 -19686 -19687  0
c  -3 does not represent an automaton state.
c    -( b^{109, 3}_2 ∧  b^{109, 3}_1 ∧  b^{109, 3}_0 ∧ true) 
c  in CNF:
c    -b^{109, 3}_2 ∨ -b^{109, 3}_1 ∨ -b^{109, 3}_0 ∨ false 
c  in DIMACS:
-19685 -19686 -19687  0

c i = 4
c  -2+1 --> -1
c    ( b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧  p_436) -> ( b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0)
c  in CNF:
c    -b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨  b^{109, 5}_2
c    -b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_1
c    -b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨  b^{109, 5}_0
c  in DIMACS:
-19688 -19689  19690 -436  19691 0
-19688 -19689  19690 -436 -19692 0
-19688 -19689  19690 -436  19693 0

c  -1+1 --> 0
c    ( b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0 ∧  p_436) -> (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧ -b^{109, 5}_0)
c  in CNF:
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_2
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_1
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_0
c  in DIMACS:
-19688  19689 -19690 -436 -19691 0
-19688  19689 -19690 -436 -19692 0
-19688  19689 -19690 -436 -19693 0

c  0+1 --> 1
c    (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧  p_436) -> (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0)
c  in CNF:
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_2
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_1
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨  b^{109, 5}_0
c  in DIMACS:
 19688  19689  19690 -436 -19691 0
 19688  19689  19690 -436 -19692 0
 19688  19689  19690 -436  19693 0

c  1+1 --> 2
c    (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0 ∧  p_436) -> (-b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0)
c  in CNF:
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_2
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨  b^{109, 5}_1
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ -p_436 ∨ -b^{109, 5}_0
c  in DIMACS:
 19688  19689 -19690 -436 -19691 0
 19688  19689 -19690 -436  19692 0
 19688  19689 -19690 -436 -19693 0

c  2+1 --> break 
c    (-b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧  p_436) -> break
c  in CNF:
c     b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ -p_436 ∨ break
c  in DIMACS:
 19688 -19689  19690 -436 1162 0


c  2-1 --> 1
c    (-b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧ -p_436) -> (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0)
c  in CNF:
c     b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_2
c     b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_1
c     b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨  b^{109, 5}_0
c  in DIMACS:
 19688 -19689  19690  436 -19691 0
 19688 -19689  19690  436 -19692 0
 19688 -19689  19690  436  19693 0

c  1-1 --> 0
c    (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0 ∧ -p_436) -> (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧ -b^{109, 5}_0)
c  in CNF:
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_2
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_1
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_0
c  in DIMACS:
 19688  19689 -19690  436 -19691 0
 19688  19689 -19690  436 -19692 0
 19688  19689 -19690  436 -19693 0

c  0-1 --> -1
c    (-b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧ -p_436) -> ( b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0)
c  in CNF:
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨  b^{109, 5}_2
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_1
c     b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨  b^{109, 5}_0
c  in DIMACS:
 19688  19689  19690  436  19691 0
 19688  19689  19690  436 -19692 0
 19688  19689  19690  436  19693 0

c  -1-1 --> -2
c    ( b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧  b^{109, 4}_0 ∧ -p_436) -> ( b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0)
c  in CNF:
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨  b^{109, 5}_2
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨  b^{109, 5}_1
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨  p_436 ∨ -b^{109, 5}_0
c  in DIMACS:
-19688  19689 -19690  436  19691 0
-19688  19689 -19690  436  19692 0
-19688  19689 -19690  436 -19693 0

c  -2-1 --> break 
c    ( b^{109, 4}_2 ∧  b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧ -p_436) -> break
c  in CNF:
c    -b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨  b^{109, 4}_0 ∨  p_436 ∨ break
c  in DIMACS:
-19688 -19689  19690  436 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 4}_2 ∧ -b^{109, 4}_1 ∧ -b^{109, 4}_0 ∧ true) 
c  in CNF:
c    -b^{109, 4}_2 ∨  b^{109, 4}_1 ∨  b^{109, 4}_0 ∨ false 
c  in DIMACS:
-19688  19689  19690  0

c  3 does not represent an automaton state.
c    -(-b^{109, 4}_2 ∧  b^{109, 4}_1 ∧  b^{109, 4}_0 ∧ true) 
c  in CNF:
c     b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ false 
c  in DIMACS:
 19688 -19689 -19690  0
c  -3 does not represent an automaton state.
c    -( b^{109, 4}_2 ∧  b^{109, 4}_1 ∧  b^{109, 4}_0 ∧ true) 
c  in CNF:
c    -b^{109, 4}_2 ∨ -b^{109, 4}_1 ∨ -b^{109, 4}_0 ∨ false 
c  in DIMACS:
-19688 -19689 -19690  0

c i = 5
c  -2+1 --> -1
c    ( b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧  p_545) -> ( b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0)
c  in CNF:
c    -b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨  b^{109, 6}_2
c    -b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_1
c    -b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨  b^{109, 6}_0
c  in DIMACS:
-19691 -19692  19693 -545  19694 0
-19691 -19692  19693 -545 -19695 0
-19691 -19692  19693 -545  19696 0

c  -1+1 --> 0
c    ( b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0 ∧  p_545) -> (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧ -b^{109, 6}_0)
c  in CNF:
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_2
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_1
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_0
c  in DIMACS:
-19691  19692 -19693 -545 -19694 0
-19691  19692 -19693 -545 -19695 0
-19691  19692 -19693 -545 -19696 0

c  0+1 --> 1
c    (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧  p_545) -> (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0)
c  in CNF:
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_2
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_1
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨  b^{109, 6}_0
c  in DIMACS:
 19691  19692  19693 -545 -19694 0
 19691  19692  19693 -545 -19695 0
 19691  19692  19693 -545  19696 0

c  1+1 --> 2
c    (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0 ∧  p_545) -> (-b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0)
c  in CNF:
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_2
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨  b^{109, 6}_1
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ -p_545 ∨ -b^{109, 6}_0
c  in DIMACS:
 19691  19692 -19693 -545 -19694 0
 19691  19692 -19693 -545  19695 0
 19691  19692 -19693 -545 -19696 0

c  2+1 --> break 
c    (-b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧  p_545) -> break
c  in CNF:
c     b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ -p_545 ∨ break
c  in DIMACS:
 19691 -19692  19693 -545 1162 0


c  2-1 --> 1
c    (-b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧ -p_545) -> (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0)
c  in CNF:
c     b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_2
c     b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_1
c     b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨  b^{109, 6}_0
c  in DIMACS:
 19691 -19692  19693  545 -19694 0
 19691 -19692  19693  545 -19695 0
 19691 -19692  19693  545  19696 0

c  1-1 --> 0
c    (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0 ∧ -p_545) -> (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧ -b^{109, 6}_0)
c  in CNF:
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_2
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_1
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_0
c  in DIMACS:
 19691  19692 -19693  545 -19694 0
 19691  19692 -19693  545 -19695 0
 19691  19692 -19693  545 -19696 0

c  0-1 --> -1
c    (-b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧ -p_545) -> ( b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0)
c  in CNF:
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨  b^{109, 6}_2
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_1
c     b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨  b^{109, 6}_0
c  in DIMACS:
 19691  19692  19693  545  19694 0
 19691  19692  19693  545 -19695 0
 19691  19692  19693  545  19696 0

c  -1-1 --> -2
c    ( b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧  b^{109, 5}_0 ∧ -p_545) -> ( b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0)
c  in CNF:
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨  b^{109, 6}_2
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨  b^{109, 6}_1
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨  p_545 ∨ -b^{109, 6}_0
c  in DIMACS:
-19691  19692 -19693  545  19694 0
-19691  19692 -19693  545  19695 0
-19691  19692 -19693  545 -19696 0

c  -2-1 --> break 
c    ( b^{109, 5}_2 ∧  b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧ -p_545) -> break
c  in CNF:
c    -b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨  b^{109, 5}_0 ∨  p_545 ∨ break
c  in DIMACS:
-19691 -19692  19693  545 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 5}_2 ∧ -b^{109, 5}_1 ∧ -b^{109, 5}_0 ∧ true) 
c  in CNF:
c    -b^{109, 5}_2 ∨  b^{109, 5}_1 ∨  b^{109, 5}_0 ∨ false 
c  in DIMACS:
-19691  19692  19693  0

c  3 does not represent an automaton state.
c    -(-b^{109, 5}_2 ∧  b^{109, 5}_1 ∧  b^{109, 5}_0 ∧ true) 
c  in CNF:
c     b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ false 
c  in DIMACS:
 19691 -19692 -19693  0
c  -3 does not represent an automaton state.
c    -( b^{109, 5}_2 ∧  b^{109, 5}_1 ∧  b^{109, 5}_0 ∧ true) 
c  in CNF:
c    -b^{109, 5}_2 ∨ -b^{109, 5}_1 ∨ -b^{109, 5}_0 ∨ false 
c  in DIMACS:
-19691 -19692 -19693  0

c i = 6
c  -2+1 --> -1
c    ( b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧  p_654) -> ( b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0)
c  in CNF:
c    -b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨  b^{109, 7}_2
c    -b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_1
c    -b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨  b^{109, 7}_0
c  in DIMACS:
-19694 -19695  19696 -654  19697 0
-19694 -19695  19696 -654 -19698 0
-19694 -19695  19696 -654  19699 0

c  -1+1 --> 0
c    ( b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0 ∧  p_654) -> (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧ -b^{109, 7}_0)
c  in CNF:
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_2
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_1
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_0
c  in DIMACS:
-19694  19695 -19696 -654 -19697 0
-19694  19695 -19696 -654 -19698 0
-19694  19695 -19696 -654 -19699 0

c  0+1 --> 1
c    (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧  p_654) -> (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0)
c  in CNF:
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_2
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_1
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨  b^{109, 7}_0
c  in DIMACS:
 19694  19695  19696 -654 -19697 0
 19694  19695  19696 -654 -19698 0
 19694  19695  19696 -654  19699 0

c  1+1 --> 2
c    (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0 ∧  p_654) -> (-b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0)
c  in CNF:
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_2
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨  b^{109, 7}_1
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ -p_654 ∨ -b^{109, 7}_0
c  in DIMACS:
 19694  19695 -19696 -654 -19697 0
 19694  19695 -19696 -654  19698 0
 19694  19695 -19696 -654 -19699 0

c  2+1 --> break 
c    (-b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧  p_654) -> break
c  in CNF:
c     b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 19694 -19695  19696 -654 1162 0


c  2-1 --> 1
c    (-b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧ -p_654) -> (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0)
c  in CNF:
c     b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_2
c     b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_1
c     b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨  b^{109, 7}_0
c  in DIMACS:
 19694 -19695  19696  654 -19697 0
 19694 -19695  19696  654 -19698 0
 19694 -19695  19696  654  19699 0

c  1-1 --> 0
c    (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0 ∧ -p_654) -> (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧ -b^{109, 7}_0)
c  in CNF:
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_2
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_1
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_0
c  in DIMACS:
 19694  19695 -19696  654 -19697 0
 19694  19695 -19696  654 -19698 0
 19694  19695 -19696  654 -19699 0

c  0-1 --> -1
c    (-b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧ -p_654) -> ( b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0)
c  in CNF:
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨  b^{109, 7}_2
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_1
c     b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨  b^{109, 7}_0
c  in DIMACS:
 19694  19695  19696  654  19697 0
 19694  19695  19696  654 -19698 0
 19694  19695  19696  654  19699 0

c  -1-1 --> -2
c    ( b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧  b^{109, 6}_0 ∧ -p_654) -> ( b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0)
c  in CNF:
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨  b^{109, 7}_2
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨  b^{109, 7}_1
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨  p_654 ∨ -b^{109, 7}_0
c  in DIMACS:
-19694  19695 -19696  654  19697 0
-19694  19695 -19696  654  19698 0
-19694  19695 -19696  654 -19699 0

c  -2-1 --> break 
c    ( b^{109, 6}_2 ∧  b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨  b^{109, 6}_0 ∨  p_654 ∨ break
c  in DIMACS:
-19694 -19695  19696  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 6}_2 ∧ -b^{109, 6}_1 ∧ -b^{109, 6}_0 ∧ true) 
c  in CNF:
c    -b^{109, 6}_2 ∨  b^{109, 6}_1 ∨  b^{109, 6}_0 ∨ false 
c  in DIMACS:
-19694  19695  19696  0

c  3 does not represent an automaton state.
c    -(-b^{109, 6}_2 ∧  b^{109, 6}_1 ∧  b^{109, 6}_0 ∧ true) 
c  in CNF:
c     b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ false 
c  in DIMACS:
 19694 -19695 -19696  0
c  -3 does not represent an automaton state.
c    -( b^{109, 6}_2 ∧  b^{109, 6}_1 ∧  b^{109, 6}_0 ∧ true) 
c  in CNF:
c    -b^{109, 6}_2 ∨ -b^{109, 6}_1 ∨ -b^{109, 6}_0 ∨ false 
c  in DIMACS:
-19694 -19695 -19696  0

c i = 7
c  -2+1 --> -1
c    ( b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧  p_763) -> ( b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0)
c  in CNF:
c    -b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨  b^{109, 8}_2
c    -b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_1
c    -b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨  b^{109, 8}_0
c  in DIMACS:
-19697 -19698  19699 -763  19700 0
-19697 -19698  19699 -763 -19701 0
-19697 -19698  19699 -763  19702 0

c  -1+1 --> 0
c    ( b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0 ∧  p_763) -> (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧ -b^{109, 8}_0)
c  in CNF:
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_2
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_1
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_0
c  in DIMACS:
-19697  19698 -19699 -763 -19700 0
-19697  19698 -19699 -763 -19701 0
-19697  19698 -19699 -763 -19702 0

c  0+1 --> 1
c    (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧  p_763) -> (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0)
c  in CNF:
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_2
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_1
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨  b^{109, 8}_0
c  in DIMACS:
 19697  19698  19699 -763 -19700 0
 19697  19698  19699 -763 -19701 0
 19697  19698  19699 -763  19702 0

c  1+1 --> 2
c    (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0 ∧  p_763) -> (-b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0)
c  in CNF:
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_2
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨  b^{109, 8}_1
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ -p_763 ∨ -b^{109, 8}_0
c  in DIMACS:
 19697  19698 -19699 -763 -19700 0
 19697  19698 -19699 -763  19701 0
 19697  19698 -19699 -763 -19702 0

c  2+1 --> break 
c    (-b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧  p_763) -> break
c  in CNF:
c     b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ -p_763 ∨ break
c  in DIMACS:
 19697 -19698  19699 -763 1162 0


c  2-1 --> 1
c    (-b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧ -p_763) -> (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0)
c  in CNF:
c     b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_2
c     b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_1
c     b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨  b^{109, 8}_0
c  in DIMACS:
 19697 -19698  19699  763 -19700 0
 19697 -19698  19699  763 -19701 0
 19697 -19698  19699  763  19702 0

c  1-1 --> 0
c    (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0 ∧ -p_763) -> (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧ -b^{109, 8}_0)
c  in CNF:
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_2
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_1
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_0
c  in DIMACS:
 19697  19698 -19699  763 -19700 0
 19697  19698 -19699  763 -19701 0
 19697  19698 -19699  763 -19702 0

c  0-1 --> -1
c    (-b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧ -p_763) -> ( b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0)
c  in CNF:
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨  b^{109, 8}_2
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_1
c     b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨  b^{109, 8}_0
c  in DIMACS:
 19697  19698  19699  763  19700 0
 19697  19698  19699  763 -19701 0
 19697  19698  19699  763  19702 0

c  -1-1 --> -2
c    ( b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧  b^{109, 7}_0 ∧ -p_763) -> ( b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0)
c  in CNF:
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨  b^{109, 8}_2
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨  b^{109, 8}_1
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨  p_763 ∨ -b^{109, 8}_0
c  in DIMACS:
-19697  19698 -19699  763  19700 0
-19697  19698 -19699  763  19701 0
-19697  19698 -19699  763 -19702 0

c  -2-1 --> break 
c    ( b^{109, 7}_2 ∧  b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧ -p_763) -> break
c  in CNF:
c    -b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨  b^{109, 7}_0 ∨  p_763 ∨ break
c  in DIMACS:
-19697 -19698  19699  763 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 7}_2 ∧ -b^{109, 7}_1 ∧ -b^{109, 7}_0 ∧ true) 
c  in CNF:
c    -b^{109, 7}_2 ∨  b^{109, 7}_1 ∨  b^{109, 7}_0 ∨ false 
c  in DIMACS:
-19697  19698  19699  0

c  3 does not represent an automaton state.
c    -(-b^{109, 7}_2 ∧  b^{109, 7}_1 ∧  b^{109, 7}_0 ∧ true) 
c  in CNF:
c     b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ false 
c  in DIMACS:
 19697 -19698 -19699  0
c  -3 does not represent an automaton state.
c    -( b^{109, 7}_2 ∧  b^{109, 7}_1 ∧  b^{109, 7}_0 ∧ true) 
c  in CNF:
c    -b^{109, 7}_2 ∨ -b^{109, 7}_1 ∨ -b^{109, 7}_0 ∨ false 
c  in DIMACS:
-19697 -19698 -19699  0

c i = 8
c  -2+1 --> -1
c    ( b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧  p_872) -> ( b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0)
c  in CNF:
c    -b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨  b^{109, 9}_2
c    -b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_1
c    -b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨  b^{109, 9}_0
c  in DIMACS:
-19700 -19701  19702 -872  19703 0
-19700 -19701  19702 -872 -19704 0
-19700 -19701  19702 -872  19705 0

c  -1+1 --> 0
c    ( b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0 ∧  p_872) -> (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧ -b^{109, 9}_0)
c  in CNF:
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_2
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_1
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_0
c  in DIMACS:
-19700  19701 -19702 -872 -19703 0
-19700  19701 -19702 -872 -19704 0
-19700  19701 -19702 -872 -19705 0

c  0+1 --> 1
c    (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧  p_872) -> (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0)
c  in CNF:
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_2
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_1
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨  b^{109, 9}_0
c  in DIMACS:
 19700  19701  19702 -872 -19703 0
 19700  19701  19702 -872 -19704 0
 19700  19701  19702 -872  19705 0

c  1+1 --> 2
c    (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0 ∧  p_872) -> (-b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0)
c  in CNF:
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_2
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨  b^{109, 9}_1
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ -p_872 ∨ -b^{109, 9}_0
c  in DIMACS:
 19700  19701 -19702 -872 -19703 0
 19700  19701 -19702 -872  19704 0
 19700  19701 -19702 -872 -19705 0

c  2+1 --> break 
c    (-b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧  p_872) -> break
c  in CNF:
c     b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 19700 -19701  19702 -872 1162 0


c  2-1 --> 1
c    (-b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧ -p_872) -> (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0)
c  in CNF:
c     b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_2
c     b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_1
c     b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨  b^{109, 9}_0
c  in DIMACS:
 19700 -19701  19702  872 -19703 0
 19700 -19701  19702  872 -19704 0
 19700 -19701  19702  872  19705 0

c  1-1 --> 0
c    (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0 ∧ -p_872) -> (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧ -b^{109, 9}_0)
c  in CNF:
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_2
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_1
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_0
c  in DIMACS:
 19700  19701 -19702  872 -19703 0
 19700  19701 -19702  872 -19704 0
 19700  19701 -19702  872 -19705 0

c  0-1 --> -1
c    (-b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧ -p_872) -> ( b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0)
c  in CNF:
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨  b^{109, 9}_2
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_1
c     b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨  b^{109, 9}_0
c  in DIMACS:
 19700  19701  19702  872  19703 0
 19700  19701  19702  872 -19704 0
 19700  19701  19702  872  19705 0

c  -1-1 --> -2
c    ( b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧  b^{109, 8}_0 ∧ -p_872) -> ( b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0)
c  in CNF:
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨  b^{109, 9}_2
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨  b^{109, 9}_1
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨  p_872 ∨ -b^{109, 9}_0
c  in DIMACS:
-19700  19701 -19702  872  19703 0
-19700  19701 -19702  872  19704 0
-19700  19701 -19702  872 -19705 0

c  -2-1 --> break 
c    ( b^{109, 8}_2 ∧  b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨  b^{109, 8}_0 ∨  p_872 ∨ break
c  in DIMACS:
-19700 -19701  19702  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 8}_2 ∧ -b^{109, 8}_1 ∧ -b^{109, 8}_0 ∧ true) 
c  in CNF:
c    -b^{109, 8}_2 ∨  b^{109, 8}_1 ∨  b^{109, 8}_0 ∨ false 
c  in DIMACS:
-19700  19701  19702  0

c  3 does not represent an automaton state.
c    -(-b^{109, 8}_2 ∧  b^{109, 8}_1 ∧  b^{109, 8}_0 ∧ true) 
c  in CNF:
c     b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ false 
c  in DIMACS:
 19700 -19701 -19702  0
c  -3 does not represent an automaton state.
c    -( b^{109, 8}_2 ∧  b^{109, 8}_1 ∧  b^{109, 8}_0 ∧ true) 
c  in CNF:
c    -b^{109, 8}_2 ∨ -b^{109, 8}_1 ∨ -b^{109, 8}_0 ∨ false 
c  in DIMACS:
-19700 -19701 -19702  0

c i = 9
c  -2+1 --> -1
c    ( b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧  p_981) -> ( b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0)
c  in CNF:
c    -b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨  b^{109, 10}_2
c    -b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_1
c    -b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨  b^{109, 10}_0
c  in DIMACS:
-19703 -19704  19705 -981  19706 0
-19703 -19704  19705 -981 -19707 0
-19703 -19704  19705 -981  19708 0

c  -1+1 --> 0
c    ( b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0 ∧  p_981) -> (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧ -b^{109, 10}_0)
c  in CNF:
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_2
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_1
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_0
c  in DIMACS:
-19703  19704 -19705 -981 -19706 0
-19703  19704 -19705 -981 -19707 0
-19703  19704 -19705 -981 -19708 0

c  0+1 --> 1
c    (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧  p_981) -> (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0)
c  in CNF:
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_2
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_1
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨  b^{109, 10}_0
c  in DIMACS:
 19703  19704  19705 -981 -19706 0
 19703  19704  19705 -981 -19707 0
 19703  19704  19705 -981  19708 0

c  1+1 --> 2
c    (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0 ∧  p_981) -> (-b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0)
c  in CNF:
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_2
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨  b^{109, 10}_1
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ -p_981 ∨ -b^{109, 10}_0
c  in DIMACS:
 19703  19704 -19705 -981 -19706 0
 19703  19704 -19705 -981  19707 0
 19703  19704 -19705 -981 -19708 0

c  2+1 --> break 
c    (-b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧  p_981) -> break
c  in CNF:
c     b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ -p_981 ∨ break
c  in DIMACS:
 19703 -19704  19705 -981 1162 0


c  2-1 --> 1
c    (-b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧ -p_981) -> (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0)
c  in CNF:
c     b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_2
c     b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_1
c     b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨  b^{109, 10}_0
c  in DIMACS:
 19703 -19704  19705  981 -19706 0
 19703 -19704  19705  981 -19707 0
 19703 -19704  19705  981  19708 0

c  1-1 --> 0
c    (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0 ∧ -p_981) -> (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧ -b^{109, 10}_0)
c  in CNF:
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_2
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_1
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_0
c  in DIMACS:
 19703  19704 -19705  981 -19706 0
 19703  19704 -19705  981 -19707 0
 19703  19704 -19705  981 -19708 0

c  0-1 --> -1
c    (-b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧ -p_981) -> ( b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0)
c  in CNF:
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨  b^{109, 10}_2
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_1
c     b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨  b^{109, 10}_0
c  in DIMACS:
 19703  19704  19705  981  19706 0
 19703  19704  19705  981 -19707 0
 19703  19704  19705  981  19708 0

c  -1-1 --> -2
c    ( b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧  b^{109, 9}_0 ∧ -p_981) -> ( b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0)
c  in CNF:
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨  b^{109, 10}_2
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨  b^{109, 10}_1
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨  p_981 ∨ -b^{109, 10}_0
c  in DIMACS:
-19703  19704 -19705  981  19706 0
-19703  19704 -19705  981  19707 0
-19703  19704 -19705  981 -19708 0

c  -2-1 --> break 
c    ( b^{109, 9}_2 ∧  b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧ -p_981) -> break
c  in CNF:
c    -b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨  b^{109, 9}_0 ∨  p_981 ∨ break
c  in DIMACS:
-19703 -19704  19705  981 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 9}_2 ∧ -b^{109, 9}_1 ∧ -b^{109, 9}_0 ∧ true) 
c  in CNF:
c    -b^{109, 9}_2 ∨  b^{109, 9}_1 ∨  b^{109, 9}_0 ∨ false 
c  in DIMACS:
-19703  19704  19705  0

c  3 does not represent an automaton state.
c    -(-b^{109, 9}_2 ∧  b^{109, 9}_1 ∧  b^{109, 9}_0 ∧ true) 
c  in CNF:
c     b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ false 
c  in DIMACS:
 19703 -19704 -19705  0
c  -3 does not represent an automaton state.
c    -( b^{109, 9}_2 ∧  b^{109, 9}_1 ∧  b^{109, 9}_0 ∧ true) 
c  in CNF:
c    -b^{109, 9}_2 ∨ -b^{109, 9}_1 ∨ -b^{109, 9}_0 ∨ false 
c  in DIMACS:
-19703 -19704 -19705  0

c i = 10
c  -2+1 --> -1
c    ( b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧  p_1090) -> ( b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧  b^{109, 11}_0)
c  in CNF:
c    -b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨  b^{109, 11}_2
c    -b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_1
c    -b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨  b^{109, 11}_0
c  in DIMACS:
-19706 -19707  19708 -1090  19709 0
-19706 -19707  19708 -1090 -19710 0
-19706 -19707  19708 -1090  19711 0

c  -1+1 --> 0
c    ( b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0 ∧  p_1090) -> (-b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧ -b^{109, 11}_0)
c  in CNF:
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_2
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_1
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_0
c  in DIMACS:
-19706  19707 -19708 -1090 -19709 0
-19706  19707 -19708 -1090 -19710 0
-19706  19707 -19708 -1090 -19711 0

c  0+1 --> 1
c    (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧  p_1090) -> (-b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧  b^{109, 11}_0)
c  in CNF:
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_2
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_1
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨  b^{109, 11}_0
c  in DIMACS:
 19706  19707  19708 -1090 -19709 0
 19706  19707  19708 -1090 -19710 0
 19706  19707  19708 -1090  19711 0

c  1+1 --> 2
c    (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0 ∧  p_1090) -> (-b^{109, 11}_2 ∧  b^{109, 11}_1 ∧ -b^{109, 11}_0)
c  in CNF:
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_2
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨  b^{109, 11}_1
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ -p_1090 ∨ -b^{109, 11}_0
c  in DIMACS:
 19706  19707 -19708 -1090 -19709 0
 19706  19707 -19708 -1090  19710 0
 19706  19707 -19708 -1090 -19711 0

c  2+1 --> break 
c    (-b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 19706 -19707  19708 -1090 1162 0


c  2-1 --> 1
c    (-b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧ -p_1090) -> (-b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧  b^{109, 11}_0)
c  in CNF:
c     b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_2
c     b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_1
c     b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨  b^{109, 11}_0
c  in DIMACS:
 19706 -19707  19708  1090 -19709 0
 19706 -19707  19708  1090 -19710 0
 19706 -19707  19708  1090  19711 0

c  1-1 --> 0
c    (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0 ∧ -p_1090) -> (-b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧ -b^{109, 11}_0)
c  in CNF:
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_2
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_1
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_0
c  in DIMACS:
 19706  19707 -19708  1090 -19709 0
 19706  19707 -19708  1090 -19710 0
 19706  19707 -19708  1090 -19711 0

c  0-1 --> -1
c    (-b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧ -p_1090) -> ( b^{109, 11}_2 ∧ -b^{109, 11}_1 ∧  b^{109, 11}_0)
c  in CNF:
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨  b^{109, 11}_2
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_1
c     b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨  b^{109, 11}_0
c  in DIMACS:
 19706  19707  19708  1090  19709 0
 19706  19707  19708  1090 -19710 0
 19706  19707  19708  1090  19711 0

c  -1-1 --> -2
c    ( b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧  b^{109, 10}_0 ∧ -p_1090) -> ( b^{109, 11}_2 ∧  b^{109, 11}_1 ∧ -b^{109, 11}_0)
c  in CNF:
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨  b^{109, 11}_2
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨  b^{109, 11}_1
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨  p_1090 ∨ -b^{109, 11}_0
c  in DIMACS:
-19706  19707 -19708  1090  19709 0
-19706  19707 -19708  1090  19710 0
-19706  19707 -19708  1090 -19711 0

c  -2-1 --> break 
c    ( b^{109, 10}_2 ∧  b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨  b^{109, 10}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-19706 -19707  19708  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{109, 10}_2 ∧ -b^{109, 10}_1 ∧ -b^{109, 10}_0 ∧ true) 
c  in CNF:
c    -b^{109, 10}_2 ∨  b^{109, 10}_1 ∨  b^{109, 10}_0 ∨ false 
c  in DIMACS:
-19706  19707  19708  0

c  3 does not represent an automaton state.
c    -(-b^{109, 10}_2 ∧  b^{109, 10}_1 ∧  b^{109, 10}_0 ∧ true) 
c  in CNF:
c     b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ false 
c  in DIMACS:
 19706 -19707 -19708  0
c  -3 does not represent an automaton state.
c    -( b^{109, 10}_2 ∧  b^{109, 10}_1 ∧  b^{109, 10}_0 ∧ true) 
c  in CNF:
c    -b^{109, 10}_2 ∨ -b^{109, 10}_1 ∨ -b^{109, 10}_0 ∨ false 
c  in DIMACS:
-19706 -19707 -19708  0

c INIT for k = 110
c    -b^{110, 1}_2
c    -b^{110, 1}_1
c    -b^{110, 1}_0
c  in DIMACS:
-19712 0
-19713 0
-19714 0

c Transitions for k = 110
c i = 1
c  -2+1 --> -1
c    ( b^{110, 1}_2 ∧  b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧  p_110) -> ( b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0)
c  in CNF:
c    -b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨  b^{110, 2}_2
c    -b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_1
c    -b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨  b^{110, 2}_0
c  in DIMACS:
-19712 -19713  19714 -110  19715 0
-19712 -19713  19714 -110 -19716 0
-19712 -19713  19714 -110  19717 0

c  -1+1 --> 0
c    ( b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧  b^{110, 1}_0 ∧  p_110) -> (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧ -b^{110, 2}_0)
c  in CNF:
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_2
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_1
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_0
c  in DIMACS:
-19712  19713 -19714 -110 -19715 0
-19712  19713 -19714 -110 -19716 0
-19712  19713 -19714 -110 -19717 0

c  0+1 --> 1
c    (-b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧  p_110) -> (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0)
c  in CNF:
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_2
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_1
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨  b^{110, 2}_0
c  in DIMACS:
 19712  19713  19714 -110 -19715 0
 19712  19713  19714 -110 -19716 0
 19712  19713  19714 -110  19717 0

c  1+1 --> 2
c    (-b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧  b^{110, 1}_0 ∧  p_110) -> (-b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0)
c  in CNF:
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_2
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨  b^{110, 2}_1
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ -p_110 ∨ -b^{110, 2}_0
c  in DIMACS:
 19712  19713 -19714 -110 -19715 0
 19712  19713 -19714 -110  19716 0
 19712  19713 -19714 -110 -19717 0

c  2+1 --> break 
c    (-b^{110, 1}_2 ∧  b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧  p_110) -> break
c  in CNF:
c     b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ -p_110 ∨ break
c  in DIMACS:
 19712 -19713  19714 -110 1162 0


c  2-1 --> 1
c    (-b^{110, 1}_2 ∧  b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧ -p_110) -> (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0)
c  in CNF:
c     b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_2
c     b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_1
c     b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨  b^{110, 2}_0
c  in DIMACS:
 19712 -19713  19714  110 -19715 0
 19712 -19713  19714  110 -19716 0
 19712 -19713  19714  110  19717 0

c  1-1 --> 0
c    (-b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧  b^{110, 1}_0 ∧ -p_110) -> (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧ -b^{110, 2}_0)
c  in CNF:
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_2
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_1
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_0
c  in DIMACS:
 19712  19713 -19714  110 -19715 0
 19712  19713 -19714  110 -19716 0
 19712  19713 -19714  110 -19717 0

c  0-1 --> -1
c    (-b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧ -p_110) -> ( b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0)
c  in CNF:
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨  b^{110, 2}_2
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_1
c     b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨  b^{110, 2}_0
c  in DIMACS:
 19712  19713  19714  110  19715 0
 19712  19713  19714  110 -19716 0
 19712  19713  19714  110  19717 0

c  -1-1 --> -2
c    ( b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧  b^{110, 1}_0 ∧ -p_110) -> ( b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0)
c  in CNF:
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨  b^{110, 2}_2
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨  b^{110, 2}_1
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨  p_110 ∨ -b^{110, 2}_0
c  in DIMACS:
-19712  19713 -19714  110  19715 0
-19712  19713 -19714  110  19716 0
-19712  19713 -19714  110 -19717 0

c  -2-1 --> break 
c    ( b^{110, 1}_2 ∧  b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧ -p_110) -> break
c  in CNF:
c    -b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨  b^{110, 1}_0 ∨  p_110 ∨ break
c  in DIMACS:
-19712 -19713  19714  110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 1}_2 ∧ -b^{110, 1}_1 ∧ -b^{110, 1}_0 ∧ true) 
c  in CNF:
c    -b^{110, 1}_2 ∨  b^{110, 1}_1 ∨  b^{110, 1}_0 ∨ false 
c  in DIMACS:
-19712  19713  19714  0

c  3 does not represent an automaton state.
c    -(-b^{110, 1}_2 ∧  b^{110, 1}_1 ∧  b^{110, 1}_0 ∧ true) 
c  in CNF:
c     b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ false 
c  in DIMACS:
 19712 -19713 -19714  0
c  -3 does not represent an automaton state.
c    -( b^{110, 1}_2 ∧  b^{110, 1}_1 ∧  b^{110, 1}_0 ∧ true) 
c  in CNF:
c    -b^{110, 1}_2 ∨ -b^{110, 1}_1 ∨ -b^{110, 1}_0 ∨ false 
c  in DIMACS:
-19712 -19713 -19714  0

c i = 2
c  -2+1 --> -1
c    ( b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧  p_220) -> ( b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0)
c  in CNF:
c    -b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨  b^{110, 3}_2
c    -b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_1
c    -b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨  b^{110, 3}_0
c  in DIMACS:
-19715 -19716  19717 -220  19718 0
-19715 -19716  19717 -220 -19719 0
-19715 -19716  19717 -220  19720 0

c  -1+1 --> 0
c    ( b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0 ∧  p_220) -> (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧ -b^{110, 3}_0)
c  in CNF:
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_2
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_1
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_0
c  in DIMACS:
-19715  19716 -19717 -220 -19718 0
-19715  19716 -19717 -220 -19719 0
-19715  19716 -19717 -220 -19720 0

c  0+1 --> 1
c    (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧  p_220) -> (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0)
c  in CNF:
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_2
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_1
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨  b^{110, 3}_0
c  in DIMACS:
 19715  19716  19717 -220 -19718 0
 19715  19716  19717 -220 -19719 0
 19715  19716  19717 -220  19720 0

c  1+1 --> 2
c    (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0 ∧  p_220) -> (-b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0)
c  in CNF:
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_2
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨  b^{110, 3}_1
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ -p_220 ∨ -b^{110, 3}_0
c  in DIMACS:
 19715  19716 -19717 -220 -19718 0
 19715  19716 -19717 -220  19719 0
 19715  19716 -19717 -220 -19720 0

c  2+1 --> break 
c    (-b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧  p_220) -> break
c  in CNF:
c     b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 19715 -19716  19717 -220 1162 0


c  2-1 --> 1
c    (-b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧ -p_220) -> (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0)
c  in CNF:
c     b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_2
c     b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_1
c     b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨  b^{110, 3}_0
c  in DIMACS:
 19715 -19716  19717  220 -19718 0
 19715 -19716  19717  220 -19719 0
 19715 -19716  19717  220  19720 0

c  1-1 --> 0
c    (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0 ∧ -p_220) -> (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧ -b^{110, 3}_0)
c  in CNF:
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_2
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_1
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_0
c  in DIMACS:
 19715  19716 -19717  220 -19718 0
 19715  19716 -19717  220 -19719 0
 19715  19716 -19717  220 -19720 0

c  0-1 --> -1
c    (-b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧ -p_220) -> ( b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0)
c  in CNF:
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨  b^{110, 3}_2
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_1
c     b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨  b^{110, 3}_0
c  in DIMACS:
 19715  19716  19717  220  19718 0
 19715  19716  19717  220 -19719 0
 19715  19716  19717  220  19720 0

c  -1-1 --> -2
c    ( b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧  b^{110, 2}_0 ∧ -p_220) -> ( b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0)
c  in CNF:
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨  b^{110, 3}_2
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨  b^{110, 3}_1
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨  p_220 ∨ -b^{110, 3}_0
c  in DIMACS:
-19715  19716 -19717  220  19718 0
-19715  19716 -19717  220  19719 0
-19715  19716 -19717  220 -19720 0

c  -2-1 --> break 
c    ( b^{110, 2}_2 ∧  b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨  b^{110, 2}_0 ∨  p_220 ∨ break
c  in DIMACS:
-19715 -19716  19717  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 2}_2 ∧ -b^{110, 2}_1 ∧ -b^{110, 2}_0 ∧ true) 
c  in CNF:
c    -b^{110, 2}_2 ∨  b^{110, 2}_1 ∨  b^{110, 2}_0 ∨ false 
c  in DIMACS:
-19715  19716  19717  0

c  3 does not represent an automaton state.
c    -(-b^{110, 2}_2 ∧  b^{110, 2}_1 ∧  b^{110, 2}_0 ∧ true) 
c  in CNF:
c     b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ false 
c  in DIMACS:
 19715 -19716 -19717  0
c  -3 does not represent an automaton state.
c    -( b^{110, 2}_2 ∧  b^{110, 2}_1 ∧  b^{110, 2}_0 ∧ true) 
c  in CNF:
c    -b^{110, 2}_2 ∨ -b^{110, 2}_1 ∨ -b^{110, 2}_0 ∨ false 
c  in DIMACS:
-19715 -19716 -19717  0

c i = 3
c  -2+1 --> -1
c    ( b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧  p_330) -> ( b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0)
c  in CNF:
c    -b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨  b^{110, 4}_2
c    -b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_1
c    -b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨  b^{110, 4}_0
c  in DIMACS:
-19718 -19719  19720 -330  19721 0
-19718 -19719  19720 -330 -19722 0
-19718 -19719  19720 -330  19723 0

c  -1+1 --> 0
c    ( b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0 ∧  p_330) -> (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧ -b^{110, 4}_0)
c  in CNF:
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_2
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_1
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_0
c  in DIMACS:
-19718  19719 -19720 -330 -19721 0
-19718  19719 -19720 -330 -19722 0
-19718  19719 -19720 -330 -19723 0

c  0+1 --> 1
c    (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧  p_330) -> (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0)
c  in CNF:
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_2
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_1
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨  b^{110, 4}_0
c  in DIMACS:
 19718  19719  19720 -330 -19721 0
 19718  19719  19720 -330 -19722 0
 19718  19719  19720 -330  19723 0

c  1+1 --> 2
c    (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0 ∧  p_330) -> (-b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0)
c  in CNF:
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_2
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨  b^{110, 4}_1
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ -p_330 ∨ -b^{110, 4}_0
c  in DIMACS:
 19718  19719 -19720 -330 -19721 0
 19718  19719 -19720 -330  19722 0
 19718  19719 -19720 -330 -19723 0

c  2+1 --> break 
c    (-b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧  p_330) -> break
c  in CNF:
c     b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 19718 -19719  19720 -330 1162 0


c  2-1 --> 1
c    (-b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧ -p_330) -> (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0)
c  in CNF:
c     b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_2
c     b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_1
c     b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨  b^{110, 4}_0
c  in DIMACS:
 19718 -19719  19720  330 -19721 0
 19718 -19719  19720  330 -19722 0
 19718 -19719  19720  330  19723 0

c  1-1 --> 0
c    (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0 ∧ -p_330) -> (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧ -b^{110, 4}_0)
c  in CNF:
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_2
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_1
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_0
c  in DIMACS:
 19718  19719 -19720  330 -19721 0
 19718  19719 -19720  330 -19722 0
 19718  19719 -19720  330 -19723 0

c  0-1 --> -1
c    (-b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧ -p_330) -> ( b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0)
c  in CNF:
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨  b^{110, 4}_2
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_1
c     b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨  b^{110, 4}_0
c  in DIMACS:
 19718  19719  19720  330  19721 0
 19718  19719  19720  330 -19722 0
 19718  19719  19720  330  19723 0

c  -1-1 --> -2
c    ( b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧  b^{110, 3}_0 ∧ -p_330) -> ( b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0)
c  in CNF:
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨  b^{110, 4}_2
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨  b^{110, 4}_1
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨  p_330 ∨ -b^{110, 4}_0
c  in DIMACS:
-19718  19719 -19720  330  19721 0
-19718  19719 -19720  330  19722 0
-19718  19719 -19720  330 -19723 0

c  -2-1 --> break 
c    ( b^{110, 3}_2 ∧  b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨  b^{110, 3}_0 ∨  p_330 ∨ break
c  in DIMACS:
-19718 -19719  19720  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 3}_2 ∧ -b^{110, 3}_1 ∧ -b^{110, 3}_0 ∧ true) 
c  in CNF:
c    -b^{110, 3}_2 ∨  b^{110, 3}_1 ∨  b^{110, 3}_0 ∨ false 
c  in DIMACS:
-19718  19719  19720  0

c  3 does not represent an automaton state.
c    -(-b^{110, 3}_2 ∧  b^{110, 3}_1 ∧  b^{110, 3}_0 ∧ true) 
c  in CNF:
c     b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ false 
c  in DIMACS:
 19718 -19719 -19720  0
c  -3 does not represent an automaton state.
c    -( b^{110, 3}_2 ∧  b^{110, 3}_1 ∧  b^{110, 3}_0 ∧ true) 
c  in CNF:
c    -b^{110, 3}_2 ∨ -b^{110, 3}_1 ∨ -b^{110, 3}_0 ∨ false 
c  in DIMACS:
-19718 -19719 -19720  0

c i = 4
c  -2+1 --> -1
c    ( b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧  p_440) -> ( b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0)
c  in CNF:
c    -b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨  b^{110, 5}_2
c    -b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_1
c    -b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨  b^{110, 5}_0
c  in DIMACS:
-19721 -19722  19723 -440  19724 0
-19721 -19722  19723 -440 -19725 0
-19721 -19722  19723 -440  19726 0

c  -1+1 --> 0
c    ( b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0 ∧  p_440) -> (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧ -b^{110, 5}_0)
c  in CNF:
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_2
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_1
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_0
c  in DIMACS:
-19721  19722 -19723 -440 -19724 0
-19721  19722 -19723 -440 -19725 0
-19721  19722 -19723 -440 -19726 0

c  0+1 --> 1
c    (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧  p_440) -> (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0)
c  in CNF:
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_2
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_1
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨  b^{110, 5}_0
c  in DIMACS:
 19721  19722  19723 -440 -19724 0
 19721  19722  19723 -440 -19725 0
 19721  19722  19723 -440  19726 0

c  1+1 --> 2
c    (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0 ∧  p_440) -> (-b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0)
c  in CNF:
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_2
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨  b^{110, 5}_1
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ -p_440 ∨ -b^{110, 5}_0
c  in DIMACS:
 19721  19722 -19723 -440 -19724 0
 19721  19722 -19723 -440  19725 0
 19721  19722 -19723 -440 -19726 0

c  2+1 --> break 
c    (-b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧  p_440) -> break
c  in CNF:
c     b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 19721 -19722  19723 -440 1162 0


c  2-1 --> 1
c    (-b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧ -p_440) -> (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0)
c  in CNF:
c     b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_2
c     b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_1
c     b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨  b^{110, 5}_0
c  in DIMACS:
 19721 -19722  19723  440 -19724 0
 19721 -19722  19723  440 -19725 0
 19721 -19722  19723  440  19726 0

c  1-1 --> 0
c    (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0 ∧ -p_440) -> (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧ -b^{110, 5}_0)
c  in CNF:
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_2
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_1
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_0
c  in DIMACS:
 19721  19722 -19723  440 -19724 0
 19721  19722 -19723  440 -19725 0
 19721  19722 -19723  440 -19726 0

c  0-1 --> -1
c    (-b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧ -p_440) -> ( b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0)
c  in CNF:
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨  b^{110, 5}_2
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_1
c     b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨  b^{110, 5}_0
c  in DIMACS:
 19721  19722  19723  440  19724 0
 19721  19722  19723  440 -19725 0
 19721  19722  19723  440  19726 0

c  -1-1 --> -2
c    ( b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧  b^{110, 4}_0 ∧ -p_440) -> ( b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0)
c  in CNF:
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨  b^{110, 5}_2
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨  b^{110, 5}_1
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨  p_440 ∨ -b^{110, 5}_0
c  in DIMACS:
-19721  19722 -19723  440  19724 0
-19721  19722 -19723  440  19725 0
-19721  19722 -19723  440 -19726 0

c  -2-1 --> break 
c    ( b^{110, 4}_2 ∧  b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨  b^{110, 4}_0 ∨  p_440 ∨ break
c  in DIMACS:
-19721 -19722  19723  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 4}_2 ∧ -b^{110, 4}_1 ∧ -b^{110, 4}_0 ∧ true) 
c  in CNF:
c    -b^{110, 4}_2 ∨  b^{110, 4}_1 ∨  b^{110, 4}_0 ∨ false 
c  in DIMACS:
-19721  19722  19723  0

c  3 does not represent an automaton state.
c    -(-b^{110, 4}_2 ∧  b^{110, 4}_1 ∧  b^{110, 4}_0 ∧ true) 
c  in CNF:
c     b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ false 
c  in DIMACS:
 19721 -19722 -19723  0
c  -3 does not represent an automaton state.
c    -( b^{110, 4}_2 ∧  b^{110, 4}_1 ∧  b^{110, 4}_0 ∧ true) 
c  in CNF:
c    -b^{110, 4}_2 ∨ -b^{110, 4}_1 ∨ -b^{110, 4}_0 ∨ false 
c  in DIMACS:
-19721 -19722 -19723  0

c i = 5
c  -2+1 --> -1
c    ( b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧  p_550) -> ( b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0)
c  in CNF:
c    -b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨  b^{110, 6}_2
c    -b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_1
c    -b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨  b^{110, 6}_0
c  in DIMACS:
-19724 -19725  19726 -550  19727 0
-19724 -19725  19726 -550 -19728 0
-19724 -19725  19726 -550  19729 0

c  -1+1 --> 0
c    ( b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0 ∧  p_550) -> (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧ -b^{110, 6}_0)
c  in CNF:
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_2
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_1
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_0
c  in DIMACS:
-19724  19725 -19726 -550 -19727 0
-19724  19725 -19726 -550 -19728 0
-19724  19725 -19726 -550 -19729 0

c  0+1 --> 1
c    (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧  p_550) -> (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0)
c  in CNF:
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_2
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_1
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨  b^{110, 6}_0
c  in DIMACS:
 19724  19725  19726 -550 -19727 0
 19724  19725  19726 -550 -19728 0
 19724  19725  19726 -550  19729 0

c  1+1 --> 2
c    (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0 ∧  p_550) -> (-b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0)
c  in CNF:
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_2
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨  b^{110, 6}_1
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ -p_550 ∨ -b^{110, 6}_0
c  in DIMACS:
 19724  19725 -19726 -550 -19727 0
 19724  19725 -19726 -550  19728 0
 19724  19725 -19726 -550 -19729 0

c  2+1 --> break 
c    (-b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧  p_550) -> break
c  in CNF:
c     b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 19724 -19725  19726 -550 1162 0


c  2-1 --> 1
c    (-b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧ -p_550) -> (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0)
c  in CNF:
c     b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_2
c     b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_1
c     b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨  b^{110, 6}_0
c  in DIMACS:
 19724 -19725  19726  550 -19727 0
 19724 -19725  19726  550 -19728 0
 19724 -19725  19726  550  19729 0

c  1-1 --> 0
c    (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0 ∧ -p_550) -> (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧ -b^{110, 6}_0)
c  in CNF:
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_2
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_1
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_0
c  in DIMACS:
 19724  19725 -19726  550 -19727 0
 19724  19725 -19726  550 -19728 0
 19724  19725 -19726  550 -19729 0

c  0-1 --> -1
c    (-b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧ -p_550) -> ( b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0)
c  in CNF:
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨  b^{110, 6}_2
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_1
c     b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨  b^{110, 6}_0
c  in DIMACS:
 19724  19725  19726  550  19727 0
 19724  19725  19726  550 -19728 0
 19724  19725  19726  550  19729 0

c  -1-1 --> -2
c    ( b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧  b^{110, 5}_0 ∧ -p_550) -> ( b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0)
c  in CNF:
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨  b^{110, 6}_2
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨  b^{110, 6}_1
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨  p_550 ∨ -b^{110, 6}_0
c  in DIMACS:
-19724  19725 -19726  550  19727 0
-19724  19725 -19726  550  19728 0
-19724  19725 -19726  550 -19729 0

c  -2-1 --> break 
c    ( b^{110, 5}_2 ∧  b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨  b^{110, 5}_0 ∨  p_550 ∨ break
c  in DIMACS:
-19724 -19725  19726  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 5}_2 ∧ -b^{110, 5}_1 ∧ -b^{110, 5}_0 ∧ true) 
c  in CNF:
c    -b^{110, 5}_2 ∨  b^{110, 5}_1 ∨  b^{110, 5}_0 ∨ false 
c  in DIMACS:
-19724  19725  19726  0

c  3 does not represent an automaton state.
c    -(-b^{110, 5}_2 ∧  b^{110, 5}_1 ∧  b^{110, 5}_0 ∧ true) 
c  in CNF:
c     b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ false 
c  in DIMACS:
 19724 -19725 -19726  0
c  -3 does not represent an automaton state.
c    -( b^{110, 5}_2 ∧  b^{110, 5}_1 ∧  b^{110, 5}_0 ∧ true) 
c  in CNF:
c    -b^{110, 5}_2 ∨ -b^{110, 5}_1 ∨ -b^{110, 5}_0 ∨ false 
c  in DIMACS:
-19724 -19725 -19726  0

c i = 6
c  -2+1 --> -1
c    ( b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧  p_660) -> ( b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0)
c  in CNF:
c    -b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨  b^{110, 7}_2
c    -b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_1
c    -b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨  b^{110, 7}_0
c  in DIMACS:
-19727 -19728  19729 -660  19730 0
-19727 -19728  19729 -660 -19731 0
-19727 -19728  19729 -660  19732 0

c  -1+1 --> 0
c    ( b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0 ∧  p_660) -> (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧ -b^{110, 7}_0)
c  in CNF:
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_2
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_1
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_0
c  in DIMACS:
-19727  19728 -19729 -660 -19730 0
-19727  19728 -19729 -660 -19731 0
-19727  19728 -19729 -660 -19732 0

c  0+1 --> 1
c    (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧  p_660) -> (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0)
c  in CNF:
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_2
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_1
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨  b^{110, 7}_0
c  in DIMACS:
 19727  19728  19729 -660 -19730 0
 19727  19728  19729 -660 -19731 0
 19727  19728  19729 -660  19732 0

c  1+1 --> 2
c    (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0 ∧  p_660) -> (-b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0)
c  in CNF:
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_2
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨  b^{110, 7}_1
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ -p_660 ∨ -b^{110, 7}_0
c  in DIMACS:
 19727  19728 -19729 -660 -19730 0
 19727  19728 -19729 -660  19731 0
 19727  19728 -19729 -660 -19732 0

c  2+1 --> break 
c    (-b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧  p_660) -> break
c  in CNF:
c     b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 19727 -19728  19729 -660 1162 0


c  2-1 --> 1
c    (-b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧ -p_660) -> (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0)
c  in CNF:
c     b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_2
c     b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_1
c     b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨  b^{110, 7}_0
c  in DIMACS:
 19727 -19728  19729  660 -19730 0
 19727 -19728  19729  660 -19731 0
 19727 -19728  19729  660  19732 0

c  1-1 --> 0
c    (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0 ∧ -p_660) -> (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧ -b^{110, 7}_0)
c  in CNF:
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_2
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_1
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_0
c  in DIMACS:
 19727  19728 -19729  660 -19730 0
 19727  19728 -19729  660 -19731 0
 19727  19728 -19729  660 -19732 0

c  0-1 --> -1
c    (-b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧ -p_660) -> ( b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0)
c  in CNF:
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨  b^{110, 7}_2
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_1
c     b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨  b^{110, 7}_0
c  in DIMACS:
 19727  19728  19729  660  19730 0
 19727  19728  19729  660 -19731 0
 19727  19728  19729  660  19732 0

c  -1-1 --> -2
c    ( b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧  b^{110, 6}_0 ∧ -p_660) -> ( b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0)
c  in CNF:
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨  b^{110, 7}_2
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨  b^{110, 7}_1
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨  p_660 ∨ -b^{110, 7}_0
c  in DIMACS:
-19727  19728 -19729  660  19730 0
-19727  19728 -19729  660  19731 0
-19727  19728 -19729  660 -19732 0

c  -2-1 --> break 
c    ( b^{110, 6}_2 ∧  b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨  b^{110, 6}_0 ∨  p_660 ∨ break
c  in DIMACS:
-19727 -19728  19729  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 6}_2 ∧ -b^{110, 6}_1 ∧ -b^{110, 6}_0 ∧ true) 
c  in CNF:
c    -b^{110, 6}_2 ∨  b^{110, 6}_1 ∨  b^{110, 6}_0 ∨ false 
c  in DIMACS:
-19727  19728  19729  0

c  3 does not represent an automaton state.
c    -(-b^{110, 6}_2 ∧  b^{110, 6}_1 ∧  b^{110, 6}_0 ∧ true) 
c  in CNF:
c     b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ false 
c  in DIMACS:
 19727 -19728 -19729  0
c  -3 does not represent an automaton state.
c    -( b^{110, 6}_2 ∧  b^{110, 6}_1 ∧  b^{110, 6}_0 ∧ true) 
c  in CNF:
c    -b^{110, 6}_2 ∨ -b^{110, 6}_1 ∨ -b^{110, 6}_0 ∨ false 
c  in DIMACS:
-19727 -19728 -19729  0

c i = 7
c  -2+1 --> -1
c    ( b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧  p_770) -> ( b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0)
c  in CNF:
c    -b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨  b^{110, 8}_2
c    -b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_1
c    -b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨  b^{110, 8}_0
c  in DIMACS:
-19730 -19731  19732 -770  19733 0
-19730 -19731  19732 -770 -19734 0
-19730 -19731  19732 -770  19735 0

c  -1+1 --> 0
c    ( b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0 ∧  p_770) -> (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧ -b^{110, 8}_0)
c  in CNF:
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_2
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_1
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_0
c  in DIMACS:
-19730  19731 -19732 -770 -19733 0
-19730  19731 -19732 -770 -19734 0
-19730  19731 -19732 -770 -19735 0

c  0+1 --> 1
c    (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧  p_770) -> (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0)
c  in CNF:
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_2
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_1
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨  b^{110, 8}_0
c  in DIMACS:
 19730  19731  19732 -770 -19733 0
 19730  19731  19732 -770 -19734 0
 19730  19731  19732 -770  19735 0

c  1+1 --> 2
c    (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0 ∧  p_770) -> (-b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0)
c  in CNF:
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_2
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨  b^{110, 8}_1
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ -p_770 ∨ -b^{110, 8}_0
c  in DIMACS:
 19730  19731 -19732 -770 -19733 0
 19730  19731 -19732 -770  19734 0
 19730  19731 -19732 -770 -19735 0

c  2+1 --> break 
c    (-b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧  p_770) -> break
c  in CNF:
c     b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 19730 -19731  19732 -770 1162 0


c  2-1 --> 1
c    (-b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧ -p_770) -> (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0)
c  in CNF:
c     b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_2
c     b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_1
c     b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨  b^{110, 8}_0
c  in DIMACS:
 19730 -19731  19732  770 -19733 0
 19730 -19731  19732  770 -19734 0
 19730 -19731  19732  770  19735 0

c  1-1 --> 0
c    (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0 ∧ -p_770) -> (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧ -b^{110, 8}_0)
c  in CNF:
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_2
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_1
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_0
c  in DIMACS:
 19730  19731 -19732  770 -19733 0
 19730  19731 -19732  770 -19734 0
 19730  19731 -19732  770 -19735 0

c  0-1 --> -1
c    (-b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧ -p_770) -> ( b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0)
c  in CNF:
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨  b^{110, 8}_2
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_1
c     b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨  b^{110, 8}_0
c  in DIMACS:
 19730  19731  19732  770  19733 0
 19730  19731  19732  770 -19734 0
 19730  19731  19732  770  19735 0

c  -1-1 --> -2
c    ( b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧  b^{110, 7}_0 ∧ -p_770) -> ( b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0)
c  in CNF:
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨  b^{110, 8}_2
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨  b^{110, 8}_1
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨  p_770 ∨ -b^{110, 8}_0
c  in DIMACS:
-19730  19731 -19732  770  19733 0
-19730  19731 -19732  770  19734 0
-19730  19731 -19732  770 -19735 0

c  -2-1 --> break 
c    ( b^{110, 7}_2 ∧  b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨  b^{110, 7}_0 ∨  p_770 ∨ break
c  in DIMACS:
-19730 -19731  19732  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 7}_2 ∧ -b^{110, 7}_1 ∧ -b^{110, 7}_0 ∧ true) 
c  in CNF:
c    -b^{110, 7}_2 ∨  b^{110, 7}_1 ∨  b^{110, 7}_0 ∨ false 
c  in DIMACS:
-19730  19731  19732  0

c  3 does not represent an automaton state.
c    -(-b^{110, 7}_2 ∧  b^{110, 7}_1 ∧  b^{110, 7}_0 ∧ true) 
c  in CNF:
c     b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ false 
c  in DIMACS:
 19730 -19731 -19732  0
c  -3 does not represent an automaton state.
c    -( b^{110, 7}_2 ∧  b^{110, 7}_1 ∧  b^{110, 7}_0 ∧ true) 
c  in CNF:
c    -b^{110, 7}_2 ∨ -b^{110, 7}_1 ∨ -b^{110, 7}_0 ∨ false 
c  in DIMACS:
-19730 -19731 -19732  0

c i = 8
c  -2+1 --> -1
c    ( b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧  p_880) -> ( b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0)
c  in CNF:
c    -b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨  b^{110, 9}_2
c    -b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_1
c    -b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨  b^{110, 9}_0
c  in DIMACS:
-19733 -19734  19735 -880  19736 0
-19733 -19734  19735 -880 -19737 0
-19733 -19734  19735 -880  19738 0

c  -1+1 --> 0
c    ( b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0 ∧  p_880) -> (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧ -b^{110, 9}_0)
c  in CNF:
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_2
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_1
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_0
c  in DIMACS:
-19733  19734 -19735 -880 -19736 0
-19733  19734 -19735 -880 -19737 0
-19733  19734 -19735 -880 -19738 0

c  0+1 --> 1
c    (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧  p_880) -> (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0)
c  in CNF:
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_2
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_1
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨  b^{110, 9}_0
c  in DIMACS:
 19733  19734  19735 -880 -19736 0
 19733  19734  19735 -880 -19737 0
 19733  19734  19735 -880  19738 0

c  1+1 --> 2
c    (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0 ∧  p_880) -> (-b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0)
c  in CNF:
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_2
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨  b^{110, 9}_1
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ -p_880 ∨ -b^{110, 9}_0
c  in DIMACS:
 19733  19734 -19735 -880 -19736 0
 19733  19734 -19735 -880  19737 0
 19733  19734 -19735 -880 -19738 0

c  2+1 --> break 
c    (-b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧  p_880) -> break
c  in CNF:
c     b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 19733 -19734  19735 -880 1162 0


c  2-1 --> 1
c    (-b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧ -p_880) -> (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0)
c  in CNF:
c     b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_2
c     b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_1
c     b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨  b^{110, 9}_0
c  in DIMACS:
 19733 -19734  19735  880 -19736 0
 19733 -19734  19735  880 -19737 0
 19733 -19734  19735  880  19738 0

c  1-1 --> 0
c    (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0 ∧ -p_880) -> (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧ -b^{110, 9}_0)
c  in CNF:
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_2
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_1
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_0
c  in DIMACS:
 19733  19734 -19735  880 -19736 0
 19733  19734 -19735  880 -19737 0
 19733  19734 -19735  880 -19738 0

c  0-1 --> -1
c    (-b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧ -p_880) -> ( b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0)
c  in CNF:
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨  b^{110, 9}_2
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_1
c     b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨  b^{110, 9}_0
c  in DIMACS:
 19733  19734  19735  880  19736 0
 19733  19734  19735  880 -19737 0
 19733  19734  19735  880  19738 0

c  -1-1 --> -2
c    ( b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧  b^{110, 8}_0 ∧ -p_880) -> ( b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0)
c  in CNF:
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨  b^{110, 9}_2
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨  b^{110, 9}_1
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨  p_880 ∨ -b^{110, 9}_0
c  in DIMACS:
-19733  19734 -19735  880  19736 0
-19733  19734 -19735  880  19737 0
-19733  19734 -19735  880 -19738 0

c  -2-1 --> break 
c    ( b^{110, 8}_2 ∧  b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨  b^{110, 8}_0 ∨  p_880 ∨ break
c  in DIMACS:
-19733 -19734  19735  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 8}_2 ∧ -b^{110, 8}_1 ∧ -b^{110, 8}_0 ∧ true) 
c  in CNF:
c    -b^{110, 8}_2 ∨  b^{110, 8}_1 ∨  b^{110, 8}_0 ∨ false 
c  in DIMACS:
-19733  19734  19735  0

c  3 does not represent an automaton state.
c    -(-b^{110, 8}_2 ∧  b^{110, 8}_1 ∧  b^{110, 8}_0 ∧ true) 
c  in CNF:
c     b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ false 
c  in DIMACS:
 19733 -19734 -19735  0
c  -3 does not represent an automaton state.
c    -( b^{110, 8}_2 ∧  b^{110, 8}_1 ∧  b^{110, 8}_0 ∧ true) 
c  in CNF:
c    -b^{110, 8}_2 ∨ -b^{110, 8}_1 ∨ -b^{110, 8}_0 ∨ false 
c  in DIMACS:
-19733 -19734 -19735  0

c i = 9
c  -2+1 --> -1
c    ( b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧  p_990) -> ( b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0)
c  in CNF:
c    -b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨  b^{110, 10}_2
c    -b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_1
c    -b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨  b^{110, 10}_0
c  in DIMACS:
-19736 -19737  19738 -990  19739 0
-19736 -19737  19738 -990 -19740 0
-19736 -19737  19738 -990  19741 0

c  -1+1 --> 0
c    ( b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0 ∧  p_990) -> (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧ -b^{110, 10}_0)
c  in CNF:
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_2
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_1
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_0
c  in DIMACS:
-19736  19737 -19738 -990 -19739 0
-19736  19737 -19738 -990 -19740 0
-19736  19737 -19738 -990 -19741 0

c  0+1 --> 1
c    (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧  p_990) -> (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0)
c  in CNF:
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_2
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_1
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨  b^{110, 10}_0
c  in DIMACS:
 19736  19737  19738 -990 -19739 0
 19736  19737  19738 -990 -19740 0
 19736  19737  19738 -990  19741 0

c  1+1 --> 2
c    (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0 ∧  p_990) -> (-b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0)
c  in CNF:
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_2
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨  b^{110, 10}_1
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ -p_990 ∨ -b^{110, 10}_0
c  in DIMACS:
 19736  19737 -19738 -990 -19739 0
 19736  19737 -19738 -990  19740 0
 19736  19737 -19738 -990 -19741 0

c  2+1 --> break 
c    (-b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧  p_990) -> break
c  in CNF:
c     b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 19736 -19737  19738 -990 1162 0


c  2-1 --> 1
c    (-b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧ -p_990) -> (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0)
c  in CNF:
c     b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_2
c     b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_1
c     b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨  b^{110, 10}_0
c  in DIMACS:
 19736 -19737  19738  990 -19739 0
 19736 -19737  19738  990 -19740 0
 19736 -19737  19738  990  19741 0

c  1-1 --> 0
c    (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0 ∧ -p_990) -> (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧ -b^{110, 10}_0)
c  in CNF:
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_2
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_1
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_0
c  in DIMACS:
 19736  19737 -19738  990 -19739 0
 19736  19737 -19738  990 -19740 0
 19736  19737 -19738  990 -19741 0

c  0-1 --> -1
c    (-b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧ -p_990) -> ( b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0)
c  in CNF:
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨  b^{110, 10}_2
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_1
c     b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨  b^{110, 10}_0
c  in DIMACS:
 19736  19737  19738  990  19739 0
 19736  19737  19738  990 -19740 0
 19736  19737  19738  990  19741 0

c  -1-1 --> -2
c    ( b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧  b^{110, 9}_0 ∧ -p_990) -> ( b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0)
c  in CNF:
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨  b^{110, 10}_2
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨  b^{110, 10}_1
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨  p_990 ∨ -b^{110, 10}_0
c  in DIMACS:
-19736  19737 -19738  990  19739 0
-19736  19737 -19738  990  19740 0
-19736  19737 -19738  990 -19741 0

c  -2-1 --> break 
c    ( b^{110, 9}_2 ∧  b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨  b^{110, 9}_0 ∨  p_990 ∨ break
c  in DIMACS:
-19736 -19737  19738  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 9}_2 ∧ -b^{110, 9}_1 ∧ -b^{110, 9}_0 ∧ true) 
c  in CNF:
c    -b^{110, 9}_2 ∨  b^{110, 9}_1 ∨  b^{110, 9}_0 ∨ false 
c  in DIMACS:
-19736  19737  19738  0

c  3 does not represent an automaton state.
c    -(-b^{110, 9}_2 ∧  b^{110, 9}_1 ∧  b^{110, 9}_0 ∧ true) 
c  in CNF:
c     b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ false 
c  in DIMACS:
 19736 -19737 -19738  0
c  -3 does not represent an automaton state.
c    -( b^{110, 9}_2 ∧  b^{110, 9}_1 ∧  b^{110, 9}_0 ∧ true) 
c  in CNF:
c    -b^{110, 9}_2 ∨ -b^{110, 9}_1 ∨ -b^{110, 9}_0 ∨ false 
c  in DIMACS:
-19736 -19737 -19738  0

c i = 10
c  -2+1 --> -1
c    ( b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧  p_1100) -> ( b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧  b^{110, 11}_0)
c  in CNF:
c    -b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨  b^{110, 11}_2
c    -b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_1
c    -b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨  b^{110, 11}_0
c  in DIMACS:
-19739 -19740  19741 -1100  19742 0
-19739 -19740  19741 -1100 -19743 0
-19739 -19740  19741 -1100  19744 0

c  -1+1 --> 0
c    ( b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0 ∧  p_1100) -> (-b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧ -b^{110, 11}_0)
c  in CNF:
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_2
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_1
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_0
c  in DIMACS:
-19739  19740 -19741 -1100 -19742 0
-19739  19740 -19741 -1100 -19743 0
-19739  19740 -19741 -1100 -19744 0

c  0+1 --> 1
c    (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧  p_1100) -> (-b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧  b^{110, 11}_0)
c  in CNF:
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_2
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_1
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨  b^{110, 11}_0
c  in DIMACS:
 19739  19740  19741 -1100 -19742 0
 19739  19740  19741 -1100 -19743 0
 19739  19740  19741 -1100  19744 0

c  1+1 --> 2
c    (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0 ∧  p_1100) -> (-b^{110, 11}_2 ∧  b^{110, 11}_1 ∧ -b^{110, 11}_0)
c  in CNF:
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_2
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨  b^{110, 11}_1
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ -p_1100 ∨ -b^{110, 11}_0
c  in DIMACS:
 19739  19740 -19741 -1100 -19742 0
 19739  19740 -19741 -1100  19743 0
 19739  19740 -19741 -1100 -19744 0

c  2+1 --> break 
c    (-b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 19739 -19740  19741 -1100 1162 0


c  2-1 --> 1
c    (-b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧ -p_1100) -> (-b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧  b^{110, 11}_0)
c  in CNF:
c     b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_2
c     b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_1
c     b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨  b^{110, 11}_0
c  in DIMACS:
 19739 -19740  19741  1100 -19742 0
 19739 -19740  19741  1100 -19743 0
 19739 -19740  19741  1100  19744 0

c  1-1 --> 0
c    (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0 ∧ -p_1100) -> (-b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧ -b^{110, 11}_0)
c  in CNF:
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_2
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_1
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_0
c  in DIMACS:
 19739  19740 -19741  1100 -19742 0
 19739  19740 -19741  1100 -19743 0
 19739  19740 -19741  1100 -19744 0

c  0-1 --> -1
c    (-b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧ -p_1100) -> ( b^{110, 11}_2 ∧ -b^{110, 11}_1 ∧  b^{110, 11}_0)
c  in CNF:
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨  b^{110, 11}_2
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_1
c     b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨  b^{110, 11}_0
c  in DIMACS:
 19739  19740  19741  1100  19742 0
 19739  19740  19741  1100 -19743 0
 19739  19740  19741  1100  19744 0

c  -1-1 --> -2
c    ( b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧  b^{110, 10}_0 ∧ -p_1100) -> ( b^{110, 11}_2 ∧  b^{110, 11}_1 ∧ -b^{110, 11}_0)
c  in CNF:
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨  b^{110, 11}_2
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨  b^{110, 11}_1
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨  p_1100 ∨ -b^{110, 11}_0
c  in DIMACS:
-19739  19740 -19741  1100  19742 0
-19739  19740 -19741  1100  19743 0
-19739  19740 -19741  1100 -19744 0

c  -2-1 --> break 
c    ( b^{110, 10}_2 ∧  b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨  b^{110, 10}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-19739 -19740  19741  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{110, 10}_2 ∧ -b^{110, 10}_1 ∧ -b^{110, 10}_0 ∧ true) 
c  in CNF:
c    -b^{110, 10}_2 ∨  b^{110, 10}_1 ∨  b^{110, 10}_0 ∨ false 
c  in DIMACS:
-19739  19740  19741  0

c  3 does not represent an automaton state.
c    -(-b^{110, 10}_2 ∧  b^{110, 10}_1 ∧  b^{110, 10}_0 ∧ true) 
c  in CNF:
c     b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ false 
c  in DIMACS:
 19739 -19740 -19741  0
c  -3 does not represent an automaton state.
c    -( b^{110, 10}_2 ∧  b^{110, 10}_1 ∧  b^{110, 10}_0 ∧ true) 
c  in CNF:
c    -b^{110, 10}_2 ∨ -b^{110, 10}_1 ∨ -b^{110, 10}_0 ∨ false 
c  in DIMACS:
-19739 -19740 -19741  0

c INIT for k = 111
c    -b^{111, 1}_2
c    -b^{111, 1}_1
c    -b^{111, 1}_0
c  in DIMACS:
-19745 0
-19746 0
-19747 0

c Transitions for k = 111
c i = 1
c  -2+1 --> -1
c    ( b^{111, 1}_2 ∧  b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧  p_111) -> ( b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0)
c  in CNF:
c    -b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨  b^{111, 2}_2
c    -b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_1
c    -b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨  b^{111, 2}_0
c  in DIMACS:
-19745 -19746  19747 -111  19748 0
-19745 -19746  19747 -111 -19749 0
-19745 -19746  19747 -111  19750 0

c  -1+1 --> 0
c    ( b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧  b^{111, 1}_0 ∧  p_111) -> (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧ -b^{111, 2}_0)
c  in CNF:
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_2
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_1
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_0
c  in DIMACS:
-19745  19746 -19747 -111 -19748 0
-19745  19746 -19747 -111 -19749 0
-19745  19746 -19747 -111 -19750 0

c  0+1 --> 1
c    (-b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧  p_111) -> (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0)
c  in CNF:
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_2
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_1
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨  b^{111, 2}_0
c  in DIMACS:
 19745  19746  19747 -111 -19748 0
 19745  19746  19747 -111 -19749 0
 19745  19746  19747 -111  19750 0

c  1+1 --> 2
c    (-b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧  b^{111, 1}_0 ∧  p_111) -> (-b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0)
c  in CNF:
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_2
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨  b^{111, 2}_1
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ -p_111 ∨ -b^{111, 2}_0
c  in DIMACS:
 19745  19746 -19747 -111 -19748 0
 19745  19746 -19747 -111  19749 0
 19745  19746 -19747 -111 -19750 0

c  2+1 --> break 
c    (-b^{111, 1}_2 ∧  b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧  p_111) -> break
c  in CNF:
c     b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ -p_111 ∨ break
c  in DIMACS:
 19745 -19746  19747 -111 1162 0


c  2-1 --> 1
c    (-b^{111, 1}_2 ∧  b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧ -p_111) -> (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0)
c  in CNF:
c     b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_2
c     b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_1
c     b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨  b^{111, 2}_0
c  in DIMACS:
 19745 -19746  19747  111 -19748 0
 19745 -19746  19747  111 -19749 0
 19745 -19746  19747  111  19750 0

c  1-1 --> 0
c    (-b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧  b^{111, 1}_0 ∧ -p_111) -> (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧ -b^{111, 2}_0)
c  in CNF:
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_2
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_1
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_0
c  in DIMACS:
 19745  19746 -19747  111 -19748 0
 19745  19746 -19747  111 -19749 0
 19745  19746 -19747  111 -19750 0

c  0-1 --> -1
c    (-b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧ -p_111) -> ( b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0)
c  in CNF:
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨  b^{111, 2}_2
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_1
c     b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨  b^{111, 2}_0
c  in DIMACS:
 19745  19746  19747  111  19748 0
 19745  19746  19747  111 -19749 0
 19745  19746  19747  111  19750 0

c  -1-1 --> -2
c    ( b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧  b^{111, 1}_0 ∧ -p_111) -> ( b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0)
c  in CNF:
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨  b^{111, 2}_2
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨  b^{111, 2}_1
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨  p_111 ∨ -b^{111, 2}_0
c  in DIMACS:
-19745  19746 -19747  111  19748 0
-19745  19746 -19747  111  19749 0
-19745  19746 -19747  111 -19750 0

c  -2-1 --> break 
c    ( b^{111, 1}_2 ∧  b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧ -p_111) -> break
c  in CNF:
c    -b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨  b^{111, 1}_0 ∨  p_111 ∨ break
c  in DIMACS:
-19745 -19746  19747  111 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 1}_2 ∧ -b^{111, 1}_1 ∧ -b^{111, 1}_0 ∧ true) 
c  in CNF:
c    -b^{111, 1}_2 ∨  b^{111, 1}_1 ∨  b^{111, 1}_0 ∨ false 
c  in DIMACS:
-19745  19746  19747  0

c  3 does not represent an automaton state.
c    -(-b^{111, 1}_2 ∧  b^{111, 1}_1 ∧  b^{111, 1}_0 ∧ true) 
c  in CNF:
c     b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ false 
c  in DIMACS:
 19745 -19746 -19747  0
c  -3 does not represent an automaton state.
c    -( b^{111, 1}_2 ∧  b^{111, 1}_1 ∧  b^{111, 1}_0 ∧ true) 
c  in CNF:
c    -b^{111, 1}_2 ∨ -b^{111, 1}_1 ∨ -b^{111, 1}_0 ∨ false 
c  in DIMACS:
-19745 -19746 -19747  0

c i = 2
c  -2+1 --> -1
c    ( b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧  p_222) -> ( b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0)
c  in CNF:
c    -b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨  b^{111, 3}_2
c    -b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_1
c    -b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨  b^{111, 3}_0
c  in DIMACS:
-19748 -19749  19750 -222  19751 0
-19748 -19749  19750 -222 -19752 0
-19748 -19749  19750 -222  19753 0

c  -1+1 --> 0
c    ( b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0 ∧  p_222) -> (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧ -b^{111, 3}_0)
c  in CNF:
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_2
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_1
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_0
c  in DIMACS:
-19748  19749 -19750 -222 -19751 0
-19748  19749 -19750 -222 -19752 0
-19748  19749 -19750 -222 -19753 0

c  0+1 --> 1
c    (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧  p_222) -> (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0)
c  in CNF:
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_2
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_1
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨  b^{111, 3}_0
c  in DIMACS:
 19748  19749  19750 -222 -19751 0
 19748  19749  19750 -222 -19752 0
 19748  19749  19750 -222  19753 0

c  1+1 --> 2
c    (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0 ∧  p_222) -> (-b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0)
c  in CNF:
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_2
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨  b^{111, 3}_1
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ -p_222 ∨ -b^{111, 3}_0
c  in DIMACS:
 19748  19749 -19750 -222 -19751 0
 19748  19749 -19750 -222  19752 0
 19748  19749 -19750 -222 -19753 0

c  2+1 --> break 
c    (-b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧  p_222) -> break
c  in CNF:
c     b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 19748 -19749  19750 -222 1162 0


c  2-1 --> 1
c    (-b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧ -p_222) -> (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0)
c  in CNF:
c     b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_2
c     b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_1
c     b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨  b^{111, 3}_0
c  in DIMACS:
 19748 -19749  19750  222 -19751 0
 19748 -19749  19750  222 -19752 0
 19748 -19749  19750  222  19753 0

c  1-1 --> 0
c    (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0 ∧ -p_222) -> (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧ -b^{111, 3}_0)
c  in CNF:
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_2
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_1
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_0
c  in DIMACS:
 19748  19749 -19750  222 -19751 0
 19748  19749 -19750  222 -19752 0
 19748  19749 -19750  222 -19753 0

c  0-1 --> -1
c    (-b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧ -p_222) -> ( b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0)
c  in CNF:
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨  b^{111, 3}_2
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_1
c     b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨  b^{111, 3}_0
c  in DIMACS:
 19748  19749  19750  222  19751 0
 19748  19749  19750  222 -19752 0
 19748  19749  19750  222  19753 0

c  -1-1 --> -2
c    ( b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧  b^{111, 2}_0 ∧ -p_222) -> ( b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0)
c  in CNF:
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨  b^{111, 3}_2
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨  b^{111, 3}_1
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨  p_222 ∨ -b^{111, 3}_0
c  in DIMACS:
-19748  19749 -19750  222  19751 0
-19748  19749 -19750  222  19752 0
-19748  19749 -19750  222 -19753 0

c  -2-1 --> break 
c    ( b^{111, 2}_2 ∧  b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨  b^{111, 2}_0 ∨  p_222 ∨ break
c  in DIMACS:
-19748 -19749  19750  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 2}_2 ∧ -b^{111, 2}_1 ∧ -b^{111, 2}_0 ∧ true) 
c  in CNF:
c    -b^{111, 2}_2 ∨  b^{111, 2}_1 ∨  b^{111, 2}_0 ∨ false 
c  in DIMACS:
-19748  19749  19750  0

c  3 does not represent an automaton state.
c    -(-b^{111, 2}_2 ∧  b^{111, 2}_1 ∧  b^{111, 2}_0 ∧ true) 
c  in CNF:
c     b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ false 
c  in DIMACS:
 19748 -19749 -19750  0
c  -3 does not represent an automaton state.
c    -( b^{111, 2}_2 ∧  b^{111, 2}_1 ∧  b^{111, 2}_0 ∧ true) 
c  in CNF:
c    -b^{111, 2}_2 ∨ -b^{111, 2}_1 ∨ -b^{111, 2}_0 ∨ false 
c  in DIMACS:
-19748 -19749 -19750  0

c i = 3
c  -2+1 --> -1
c    ( b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧  p_333) -> ( b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0)
c  in CNF:
c    -b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨  b^{111, 4}_2
c    -b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_1
c    -b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨  b^{111, 4}_0
c  in DIMACS:
-19751 -19752  19753 -333  19754 0
-19751 -19752  19753 -333 -19755 0
-19751 -19752  19753 -333  19756 0

c  -1+1 --> 0
c    ( b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0 ∧  p_333) -> (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧ -b^{111, 4}_0)
c  in CNF:
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_2
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_1
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_0
c  in DIMACS:
-19751  19752 -19753 -333 -19754 0
-19751  19752 -19753 -333 -19755 0
-19751  19752 -19753 -333 -19756 0

c  0+1 --> 1
c    (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧  p_333) -> (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0)
c  in CNF:
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_2
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_1
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨  b^{111, 4}_0
c  in DIMACS:
 19751  19752  19753 -333 -19754 0
 19751  19752  19753 -333 -19755 0
 19751  19752  19753 -333  19756 0

c  1+1 --> 2
c    (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0 ∧  p_333) -> (-b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0)
c  in CNF:
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_2
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨  b^{111, 4}_1
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ -p_333 ∨ -b^{111, 4}_0
c  in DIMACS:
 19751  19752 -19753 -333 -19754 0
 19751  19752 -19753 -333  19755 0
 19751  19752 -19753 -333 -19756 0

c  2+1 --> break 
c    (-b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧  p_333) -> break
c  in CNF:
c     b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 19751 -19752  19753 -333 1162 0


c  2-1 --> 1
c    (-b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧ -p_333) -> (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0)
c  in CNF:
c     b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_2
c     b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_1
c     b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨  b^{111, 4}_0
c  in DIMACS:
 19751 -19752  19753  333 -19754 0
 19751 -19752  19753  333 -19755 0
 19751 -19752  19753  333  19756 0

c  1-1 --> 0
c    (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0 ∧ -p_333) -> (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧ -b^{111, 4}_0)
c  in CNF:
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_2
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_1
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_0
c  in DIMACS:
 19751  19752 -19753  333 -19754 0
 19751  19752 -19753  333 -19755 0
 19751  19752 -19753  333 -19756 0

c  0-1 --> -1
c    (-b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧ -p_333) -> ( b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0)
c  in CNF:
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨  b^{111, 4}_2
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_1
c     b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨  b^{111, 4}_0
c  in DIMACS:
 19751  19752  19753  333  19754 0
 19751  19752  19753  333 -19755 0
 19751  19752  19753  333  19756 0

c  -1-1 --> -2
c    ( b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧  b^{111, 3}_0 ∧ -p_333) -> ( b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0)
c  in CNF:
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨  b^{111, 4}_2
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨  b^{111, 4}_1
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨  p_333 ∨ -b^{111, 4}_0
c  in DIMACS:
-19751  19752 -19753  333  19754 0
-19751  19752 -19753  333  19755 0
-19751  19752 -19753  333 -19756 0

c  -2-1 --> break 
c    ( b^{111, 3}_2 ∧  b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨  b^{111, 3}_0 ∨  p_333 ∨ break
c  in DIMACS:
-19751 -19752  19753  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 3}_2 ∧ -b^{111, 3}_1 ∧ -b^{111, 3}_0 ∧ true) 
c  in CNF:
c    -b^{111, 3}_2 ∨  b^{111, 3}_1 ∨  b^{111, 3}_0 ∨ false 
c  in DIMACS:
-19751  19752  19753  0

c  3 does not represent an automaton state.
c    -(-b^{111, 3}_2 ∧  b^{111, 3}_1 ∧  b^{111, 3}_0 ∧ true) 
c  in CNF:
c     b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ false 
c  in DIMACS:
 19751 -19752 -19753  0
c  -3 does not represent an automaton state.
c    -( b^{111, 3}_2 ∧  b^{111, 3}_1 ∧  b^{111, 3}_0 ∧ true) 
c  in CNF:
c    -b^{111, 3}_2 ∨ -b^{111, 3}_1 ∨ -b^{111, 3}_0 ∨ false 
c  in DIMACS:
-19751 -19752 -19753  0

c i = 4
c  -2+1 --> -1
c    ( b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧  p_444) -> ( b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0)
c  in CNF:
c    -b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨  b^{111, 5}_2
c    -b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_1
c    -b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨  b^{111, 5}_0
c  in DIMACS:
-19754 -19755  19756 -444  19757 0
-19754 -19755  19756 -444 -19758 0
-19754 -19755  19756 -444  19759 0

c  -1+1 --> 0
c    ( b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0 ∧  p_444) -> (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧ -b^{111, 5}_0)
c  in CNF:
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_2
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_1
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_0
c  in DIMACS:
-19754  19755 -19756 -444 -19757 0
-19754  19755 -19756 -444 -19758 0
-19754  19755 -19756 -444 -19759 0

c  0+1 --> 1
c    (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧  p_444) -> (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0)
c  in CNF:
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_2
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_1
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨  b^{111, 5}_0
c  in DIMACS:
 19754  19755  19756 -444 -19757 0
 19754  19755  19756 -444 -19758 0
 19754  19755  19756 -444  19759 0

c  1+1 --> 2
c    (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0 ∧  p_444) -> (-b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0)
c  in CNF:
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_2
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨  b^{111, 5}_1
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ -p_444 ∨ -b^{111, 5}_0
c  in DIMACS:
 19754  19755 -19756 -444 -19757 0
 19754  19755 -19756 -444  19758 0
 19754  19755 -19756 -444 -19759 0

c  2+1 --> break 
c    (-b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧  p_444) -> break
c  in CNF:
c     b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 19754 -19755  19756 -444 1162 0


c  2-1 --> 1
c    (-b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧ -p_444) -> (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0)
c  in CNF:
c     b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_2
c     b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_1
c     b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨  b^{111, 5}_0
c  in DIMACS:
 19754 -19755  19756  444 -19757 0
 19754 -19755  19756  444 -19758 0
 19754 -19755  19756  444  19759 0

c  1-1 --> 0
c    (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0 ∧ -p_444) -> (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧ -b^{111, 5}_0)
c  in CNF:
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_2
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_1
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_0
c  in DIMACS:
 19754  19755 -19756  444 -19757 0
 19754  19755 -19756  444 -19758 0
 19754  19755 -19756  444 -19759 0

c  0-1 --> -1
c    (-b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧ -p_444) -> ( b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0)
c  in CNF:
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨  b^{111, 5}_2
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_1
c     b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨  b^{111, 5}_0
c  in DIMACS:
 19754  19755  19756  444  19757 0
 19754  19755  19756  444 -19758 0
 19754  19755  19756  444  19759 0

c  -1-1 --> -2
c    ( b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧  b^{111, 4}_0 ∧ -p_444) -> ( b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0)
c  in CNF:
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨  b^{111, 5}_2
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨  b^{111, 5}_1
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨  p_444 ∨ -b^{111, 5}_0
c  in DIMACS:
-19754  19755 -19756  444  19757 0
-19754  19755 -19756  444  19758 0
-19754  19755 -19756  444 -19759 0

c  -2-1 --> break 
c    ( b^{111, 4}_2 ∧  b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨  b^{111, 4}_0 ∨  p_444 ∨ break
c  in DIMACS:
-19754 -19755  19756  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 4}_2 ∧ -b^{111, 4}_1 ∧ -b^{111, 4}_0 ∧ true) 
c  in CNF:
c    -b^{111, 4}_2 ∨  b^{111, 4}_1 ∨  b^{111, 4}_0 ∨ false 
c  in DIMACS:
-19754  19755  19756  0

c  3 does not represent an automaton state.
c    -(-b^{111, 4}_2 ∧  b^{111, 4}_1 ∧  b^{111, 4}_0 ∧ true) 
c  in CNF:
c     b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ false 
c  in DIMACS:
 19754 -19755 -19756  0
c  -3 does not represent an automaton state.
c    -( b^{111, 4}_2 ∧  b^{111, 4}_1 ∧  b^{111, 4}_0 ∧ true) 
c  in CNF:
c    -b^{111, 4}_2 ∨ -b^{111, 4}_1 ∨ -b^{111, 4}_0 ∨ false 
c  in DIMACS:
-19754 -19755 -19756  0

c i = 5
c  -2+1 --> -1
c    ( b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧  p_555) -> ( b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0)
c  in CNF:
c    -b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨  b^{111, 6}_2
c    -b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_1
c    -b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨  b^{111, 6}_0
c  in DIMACS:
-19757 -19758  19759 -555  19760 0
-19757 -19758  19759 -555 -19761 0
-19757 -19758  19759 -555  19762 0

c  -1+1 --> 0
c    ( b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0 ∧  p_555) -> (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧ -b^{111, 6}_0)
c  in CNF:
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_2
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_1
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_0
c  in DIMACS:
-19757  19758 -19759 -555 -19760 0
-19757  19758 -19759 -555 -19761 0
-19757  19758 -19759 -555 -19762 0

c  0+1 --> 1
c    (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧  p_555) -> (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0)
c  in CNF:
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_2
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_1
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨  b^{111, 6}_0
c  in DIMACS:
 19757  19758  19759 -555 -19760 0
 19757  19758  19759 -555 -19761 0
 19757  19758  19759 -555  19762 0

c  1+1 --> 2
c    (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0 ∧  p_555) -> (-b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0)
c  in CNF:
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_2
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨  b^{111, 6}_1
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ -p_555 ∨ -b^{111, 6}_0
c  in DIMACS:
 19757  19758 -19759 -555 -19760 0
 19757  19758 -19759 -555  19761 0
 19757  19758 -19759 -555 -19762 0

c  2+1 --> break 
c    (-b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧  p_555) -> break
c  in CNF:
c     b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 19757 -19758  19759 -555 1162 0


c  2-1 --> 1
c    (-b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧ -p_555) -> (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0)
c  in CNF:
c     b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_2
c     b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_1
c     b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨  b^{111, 6}_0
c  in DIMACS:
 19757 -19758  19759  555 -19760 0
 19757 -19758  19759  555 -19761 0
 19757 -19758  19759  555  19762 0

c  1-1 --> 0
c    (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0 ∧ -p_555) -> (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧ -b^{111, 6}_0)
c  in CNF:
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_2
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_1
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_0
c  in DIMACS:
 19757  19758 -19759  555 -19760 0
 19757  19758 -19759  555 -19761 0
 19757  19758 -19759  555 -19762 0

c  0-1 --> -1
c    (-b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧ -p_555) -> ( b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0)
c  in CNF:
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨  b^{111, 6}_2
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_1
c     b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨  b^{111, 6}_0
c  in DIMACS:
 19757  19758  19759  555  19760 0
 19757  19758  19759  555 -19761 0
 19757  19758  19759  555  19762 0

c  -1-1 --> -2
c    ( b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧  b^{111, 5}_0 ∧ -p_555) -> ( b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0)
c  in CNF:
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨  b^{111, 6}_2
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨  b^{111, 6}_1
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨  p_555 ∨ -b^{111, 6}_0
c  in DIMACS:
-19757  19758 -19759  555  19760 0
-19757  19758 -19759  555  19761 0
-19757  19758 -19759  555 -19762 0

c  -2-1 --> break 
c    ( b^{111, 5}_2 ∧  b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨  b^{111, 5}_0 ∨  p_555 ∨ break
c  in DIMACS:
-19757 -19758  19759  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 5}_2 ∧ -b^{111, 5}_1 ∧ -b^{111, 5}_0 ∧ true) 
c  in CNF:
c    -b^{111, 5}_2 ∨  b^{111, 5}_1 ∨  b^{111, 5}_0 ∨ false 
c  in DIMACS:
-19757  19758  19759  0

c  3 does not represent an automaton state.
c    -(-b^{111, 5}_2 ∧  b^{111, 5}_1 ∧  b^{111, 5}_0 ∧ true) 
c  in CNF:
c     b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ false 
c  in DIMACS:
 19757 -19758 -19759  0
c  -3 does not represent an automaton state.
c    -( b^{111, 5}_2 ∧  b^{111, 5}_1 ∧  b^{111, 5}_0 ∧ true) 
c  in CNF:
c    -b^{111, 5}_2 ∨ -b^{111, 5}_1 ∨ -b^{111, 5}_0 ∨ false 
c  in DIMACS:
-19757 -19758 -19759  0

c i = 6
c  -2+1 --> -1
c    ( b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧  p_666) -> ( b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0)
c  in CNF:
c    -b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨  b^{111, 7}_2
c    -b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_1
c    -b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨  b^{111, 7}_0
c  in DIMACS:
-19760 -19761  19762 -666  19763 0
-19760 -19761  19762 -666 -19764 0
-19760 -19761  19762 -666  19765 0

c  -1+1 --> 0
c    ( b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0 ∧  p_666) -> (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧ -b^{111, 7}_0)
c  in CNF:
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_2
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_1
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_0
c  in DIMACS:
-19760  19761 -19762 -666 -19763 0
-19760  19761 -19762 -666 -19764 0
-19760  19761 -19762 -666 -19765 0

c  0+1 --> 1
c    (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧  p_666) -> (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0)
c  in CNF:
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_2
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_1
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨  b^{111, 7}_0
c  in DIMACS:
 19760  19761  19762 -666 -19763 0
 19760  19761  19762 -666 -19764 0
 19760  19761  19762 -666  19765 0

c  1+1 --> 2
c    (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0 ∧  p_666) -> (-b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0)
c  in CNF:
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_2
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨  b^{111, 7}_1
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ -p_666 ∨ -b^{111, 7}_0
c  in DIMACS:
 19760  19761 -19762 -666 -19763 0
 19760  19761 -19762 -666  19764 0
 19760  19761 -19762 -666 -19765 0

c  2+1 --> break 
c    (-b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧  p_666) -> break
c  in CNF:
c     b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 19760 -19761  19762 -666 1162 0


c  2-1 --> 1
c    (-b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧ -p_666) -> (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0)
c  in CNF:
c     b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_2
c     b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_1
c     b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨  b^{111, 7}_0
c  in DIMACS:
 19760 -19761  19762  666 -19763 0
 19760 -19761  19762  666 -19764 0
 19760 -19761  19762  666  19765 0

c  1-1 --> 0
c    (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0 ∧ -p_666) -> (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧ -b^{111, 7}_0)
c  in CNF:
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_2
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_1
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_0
c  in DIMACS:
 19760  19761 -19762  666 -19763 0
 19760  19761 -19762  666 -19764 0
 19760  19761 -19762  666 -19765 0

c  0-1 --> -1
c    (-b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧ -p_666) -> ( b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0)
c  in CNF:
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨  b^{111, 7}_2
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_1
c     b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨  b^{111, 7}_0
c  in DIMACS:
 19760  19761  19762  666  19763 0
 19760  19761  19762  666 -19764 0
 19760  19761  19762  666  19765 0

c  -1-1 --> -2
c    ( b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧  b^{111, 6}_0 ∧ -p_666) -> ( b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0)
c  in CNF:
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨  b^{111, 7}_2
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨  b^{111, 7}_1
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨  p_666 ∨ -b^{111, 7}_0
c  in DIMACS:
-19760  19761 -19762  666  19763 0
-19760  19761 -19762  666  19764 0
-19760  19761 -19762  666 -19765 0

c  -2-1 --> break 
c    ( b^{111, 6}_2 ∧  b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨  b^{111, 6}_0 ∨  p_666 ∨ break
c  in DIMACS:
-19760 -19761  19762  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 6}_2 ∧ -b^{111, 6}_1 ∧ -b^{111, 6}_0 ∧ true) 
c  in CNF:
c    -b^{111, 6}_2 ∨  b^{111, 6}_1 ∨  b^{111, 6}_0 ∨ false 
c  in DIMACS:
-19760  19761  19762  0

c  3 does not represent an automaton state.
c    -(-b^{111, 6}_2 ∧  b^{111, 6}_1 ∧  b^{111, 6}_0 ∧ true) 
c  in CNF:
c     b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ false 
c  in DIMACS:
 19760 -19761 -19762  0
c  -3 does not represent an automaton state.
c    -( b^{111, 6}_2 ∧  b^{111, 6}_1 ∧  b^{111, 6}_0 ∧ true) 
c  in CNF:
c    -b^{111, 6}_2 ∨ -b^{111, 6}_1 ∨ -b^{111, 6}_0 ∨ false 
c  in DIMACS:
-19760 -19761 -19762  0

c i = 7
c  -2+1 --> -1
c    ( b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧  p_777) -> ( b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0)
c  in CNF:
c    -b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨  b^{111, 8}_2
c    -b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_1
c    -b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨  b^{111, 8}_0
c  in DIMACS:
-19763 -19764  19765 -777  19766 0
-19763 -19764  19765 -777 -19767 0
-19763 -19764  19765 -777  19768 0

c  -1+1 --> 0
c    ( b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0 ∧  p_777) -> (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧ -b^{111, 8}_0)
c  in CNF:
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_2
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_1
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_0
c  in DIMACS:
-19763  19764 -19765 -777 -19766 0
-19763  19764 -19765 -777 -19767 0
-19763  19764 -19765 -777 -19768 0

c  0+1 --> 1
c    (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧  p_777) -> (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0)
c  in CNF:
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_2
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_1
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨  b^{111, 8}_0
c  in DIMACS:
 19763  19764  19765 -777 -19766 0
 19763  19764  19765 -777 -19767 0
 19763  19764  19765 -777  19768 0

c  1+1 --> 2
c    (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0 ∧  p_777) -> (-b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0)
c  in CNF:
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_2
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨  b^{111, 8}_1
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ -p_777 ∨ -b^{111, 8}_0
c  in DIMACS:
 19763  19764 -19765 -777 -19766 0
 19763  19764 -19765 -777  19767 0
 19763  19764 -19765 -777 -19768 0

c  2+1 --> break 
c    (-b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧  p_777) -> break
c  in CNF:
c     b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 19763 -19764  19765 -777 1162 0


c  2-1 --> 1
c    (-b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧ -p_777) -> (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0)
c  in CNF:
c     b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_2
c     b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_1
c     b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨  b^{111, 8}_0
c  in DIMACS:
 19763 -19764  19765  777 -19766 0
 19763 -19764  19765  777 -19767 0
 19763 -19764  19765  777  19768 0

c  1-1 --> 0
c    (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0 ∧ -p_777) -> (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧ -b^{111, 8}_0)
c  in CNF:
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_2
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_1
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_0
c  in DIMACS:
 19763  19764 -19765  777 -19766 0
 19763  19764 -19765  777 -19767 0
 19763  19764 -19765  777 -19768 0

c  0-1 --> -1
c    (-b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧ -p_777) -> ( b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0)
c  in CNF:
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨  b^{111, 8}_2
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_1
c     b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨  b^{111, 8}_0
c  in DIMACS:
 19763  19764  19765  777  19766 0
 19763  19764  19765  777 -19767 0
 19763  19764  19765  777  19768 0

c  -1-1 --> -2
c    ( b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧  b^{111, 7}_0 ∧ -p_777) -> ( b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0)
c  in CNF:
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨  b^{111, 8}_2
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨  b^{111, 8}_1
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨  p_777 ∨ -b^{111, 8}_0
c  in DIMACS:
-19763  19764 -19765  777  19766 0
-19763  19764 -19765  777  19767 0
-19763  19764 -19765  777 -19768 0

c  -2-1 --> break 
c    ( b^{111, 7}_2 ∧  b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨  b^{111, 7}_0 ∨  p_777 ∨ break
c  in DIMACS:
-19763 -19764  19765  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 7}_2 ∧ -b^{111, 7}_1 ∧ -b^{111, 7}_0 ∧ true) 
c  in CNF:
c    -b^{111, 7}_2 ∨  b^{111, 7}_1 ∨  b^{111, 7}_0 ∨ false 
c  in DIMACS:
-19763  19764  19765  0

c  3 does not represent an automaton state.
c    -(-b^{111, 7}_2 ∧  b^{111, 7}_1 ∧  b^{111, 7}_0 ∧ true) 
c  in CNF:
c     b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ false 
c  in DIMACS:
 19763 -19764 -19765  0
c  -3 does not represent an automaton state.
c    -( b^{111, 7}_2 ∧  b^{111, 7}_1 ∧  b^{111, 7}_0 ∧ true) 
c  in CNF:
c    -b^{111, 7}_2 ∨ -b^{111, 7}_1 ∨ -b^{111, 7}_0 ∨ false 
c  in DIMACS:
-19763 -19764 -19765  0

c i = 8
c  -2+1 --> -1
c    ( b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧  p_888) -> ( b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0)
c  in CNF:
c    -b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨  b^{111, 9}_2
c    -b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_1
c    -b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨  b^{111, 9}_0
c  in DIMACS:
-19766 -19767  19768 -888  19769 0
-19766 -19767  19768 -888 -19770 0
-19766 -19767  19768 -888  19771 0

c  -1+1 --> 0
c    ( b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0 ∧  p_888) -> (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧ -b^{111, 9}_0)
c  in CNF:
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_2
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_1
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_0
c  in DIMACS:
-19766  19767 -19768 -888 -19769 0
-19766  19767 -19768 -888 -19770 0
-19766  19767 -19768 -888 -19771 0

c  0+1 --> 1
c    (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧  p_888) -> (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0)
c  in CNF:
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_2
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_1
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨  b^{111, 9}_0
c  in DIMACS:
 19766  19767  19768 -888 -19769 0
 19766  19767  19768 -888 -19770 0
 19766  19767  19768 -888  19771 0

c  1+1 --> 2
c    (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0 ∧  p_888) -> (-b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0)
c  in CNF:
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_2
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨  b^{111, 9}_1
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ -p_888 ∨ -b^{111, 9}_0
c  in DIMACS:
 19766  19767 -19768 -888 -19769 0
 19766  19767 -19768 -888  19770 0
 19766  19767 -19768 -888 -19771 0

c  2+1 --> break 
c    (-b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧  p_888) -> break
c  in CNF:
c     b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 19766 -19767  19768 -888 1162 0


c  2-1 --> 1
c    (-b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧ -p_888) -> (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0)
c  in CNF:
c     b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_2
c     b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_1
c     b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨  b^{111, 9}_0
c  in DIMACS:
 19766 -19767  19768  888 -19769 0
 19766 -19767  19768  888 -19770 0
 19766 -19767  19768  888  19771 0

c  1-1 --> 0
c    (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0 ∧ -p_888) -> (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧ -b^{111, 9}_0)
c  in CNF:
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_2
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_1
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_0
c  in DIMACS:
 19766  19767 -19768  888 -19769 0
 19766  19767 -19768  888 -19770 0
 19766  19767 -19768  888 -19771 0

c  0-1 --> -1
c    (-b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧ -p_888) -> ( b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0)
c  in CNF:
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨  b^{111, 9}_2
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_1
c     b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨  b^{111, 9}_0
c  in DIMACS:
 19766  19767  19768  888  19769 0
 19766  19767  19768  888 -19770 0
 19766  19767  19768  888  19771 0

c  -1-1 --> -2
c    ( b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧  b^{111, 8}_0 ∧ -p_888) -> ( b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0)
c  in CNF:
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨  b^{111, 9}_2
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨  b^{111, 9}_1
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨  p_888 ∨ -b^{111, 9}_0
c  in DIMACS:
-19766  19767 -19768  888  19769 0
-19766  19767 -19768  888  19770 0
-19766  19767 -19768  888 -19771 0

c  -2-1 --> break 
c    ( b^{111, 8}_2 ∧  b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨  b^{111, 8}_0 ∨  p_888 ∨ break
c  in DIMACS:
-19766 -19767  19768  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 8}_2 ∧ -b^{111, 8}_1 ∧ -b^{111, 8}_0 ∧ true) 
c  in CNF:
c    -b^{111, 8}_2 ∨  b^{111, 8}_1 ∨  b^{111, 8}_0 ∨ false 
c  in DIMACS:
-19766  19767  19768  0

c  3 does not represent an automaton state.
c    -(-b^{111, 8}_2 ∧  b^{111, 8}_1 ∧  b^{111, 8}_0 ∧ true) 
c  in CNF:
c     b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ false 
c  in DIMACS:
 19766 -19767 -19768  0
c  -3 does not represent an automaton state.
c    -( b^{111, 8}_2 ∧  b^{111, 8}_1 ∧  b^{111, 8}_0 ∧ true) 
c  in CNF:
c    -b^{111, 8}_2 ∨ -b^{111, 8}_1 ∨ -b^{111, 8}_0 ∨ false 
c  in DIMACS:
-19766 -19767 -19768  0

c i = 9
c  -2+1 --> -1
c    ( b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧  p_999) -> ( b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0)
c  in CNF:
c    -b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨  b^{111, 10}_2
c    -b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_1
c    -b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨  b^{111, 10}_0
c  in DIMACS:
-19769 -19770  19771 -999  19772 0
-19769 -19770  19771 -999 -19773 0
-19769 -19770  19771 -999  19774 0

c  -1+1 --> 0
c    ( b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0 ∧  p_999) -> (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧ -b^{111, 10}_0)
c  in CNF:
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_2
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_1
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_0
c  in DIMACS:
-19769  19770 -19771 -999 -19772 0
-19769  19770 -19771 -999 -19773 0
-19769  19770 -19771 -999 -19774 0

c  0+1 --> 1
c    (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧  p_999) -> (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0)
c  in CNF:
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_2
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_1
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨  b^{111, 10}_0
c  in DIMACS:
 19769  19770  19771 -999 -19772 0
 19769  19770  19771 -999 -19773 0
 19769  19770  19771 -999  19774 0

c  1+1 --> 2
c    (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0 ∧  p_999) -> (-b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0)
c  in CNF:
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_2
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨  b^{111, 10}_1
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ -p_999 ∨ -b^{111, 10}_0
c  in DIMACS:
 19769  19770 -19771 -999 -19772 0
 19769  19770 -19771 -999  19773 0
 19769  19770 -19771 -999 -19774 0

c  2+1 --> break 
c    (-b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧  p_999) -> break
c  in CNF:
c     b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 19769 -19770  19771 -999 1162 0


c  2-1 --> 1
c    (-b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧ -p_999) -> (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0)
c  in CNF:
c     b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_2
c     b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_1
c     b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨  b^{111, 10}_0
c  in DIMACS:
 19769 -19770  19771  999 -19772 0
 19769 -19770  19771  999 -19773 0
 19769 -19770  19771  999  19774 0

c  1-1 --> 0
c    (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0 ∧ -p_999) -> (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧ -b^{111, 10}_0)
c  in CNF:
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_2
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_1
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_0
c  in DIMACS:
 19769  19770 -19771  999 -19772 0
 19769  19770 -19771  999 -19773 0
 19769  19770 -19771  999 -19774 0

c  0-1 --> -1
c    (-b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧ -p_999) -> ( b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0)
c  in CNF:
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨  b^{111, 10}_2
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_1
c     b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨  b^{111, 10}_0
c  in DIMACS:
 19769  19770  19771  999  19772 0
 19769  19770  19771  999 -19773 0
 19769  19770  19771  999  19774 0

c  -1-1 --> -2
c    ( b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧  b^{111, 9}_0 ∧ -p_999) -> ( b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0)
c  in CNF:
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨  b^{111, 10}_2
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨  b^{111, 10}_1
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨  p_999 ∨ -b^{111, 10}_0
c  in DIMACS:
-19769  19770 -19771  999  19772 0
-19769  19770 -19771  999  19773 0
-19769  19770 -19771  999 -19774 0

c  -2-1 --> break 
c    ( b^{111, 9}_2 ∧  b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨  b^{111, 9}_0 ∨  p_999 ∨ break
c  in DIMACS:
-19769 -19770  19771  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 9}_2 ∧ -b^{111, 9}_1 ∧ -b^{111, 9}_0 ∧ true) 
c  in CNF:
c    -b^{111, 9}_2 ∨  b^{111, 9}_1 ∨  b^{111, 9}_0 ∨ false 
c  in DIMACS:
-19769  19770  19771  0

c  3 does not represent an automaton state.
c    -(-b^{111, 9}_2 ∧  b^{111, 9}_1 ∧  b^{111, 9}_0 ∧ true) 
c  in CNF:
c     b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ false 
c  in DIMACS:
 19769 -19770 -19771  0
c  -3 does not represent an automaton state.
c    -( b^{111, 9}_2 ∧  b^{111, 9}_1 ∧  b^{111, 9}_0 ∧ true) 
c  in CNF:
c    -b^{111, 9}_2 ∨ -b^{111, 9}_1 ∨ -b^{111, 9}_0 ∨ false 
c  in DIMACS:
-19769 -19770 -19771  0

c i = 10
c  -2+1 --> -1
c    ( b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧  p_1110) -> ( b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧  b^{111, 11}_0)
c  in CNF:
c    -b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨  b^{111, 11}_2
c    -b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_1
c    -b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨  b^{111, 11}_0
c  in DIMACS:
-19772 -19773  19774 -1110  19775 0
-19772 -19773  19774 -1110 -19776 0
-19772 -19773  19774 -1110  19777 0

c  -1+1 --> 0
c    ( b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0 ∧  p_1110) -> (-b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧ -b^{111, 11}_0)
c  in CNF:
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_2
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_1
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_0
c  in DIMACS:
-19772  19773 -19774 -1110 -19775 0
-19772  19773 -19774 -1110 -19776 0
-19772  19773 -19774 -1110 -19777 0

c  0+1 --> 1
c    (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧  p_1110) -> (-b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧  b^{111, 11}_0)
c  in CNF:
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_2
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_1
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨  b^{111, 11}_0
c  in DIMACS:
 19772  19773  19774 -1110 -19775 0
 19772  19773  19774 -1110 -19776 0
 19772  19773  19774 -1110  19777 0

c  1+1 --> 2
c    (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0 ∧  p_1110) -> (-b^{111, 11}_2 ∧  b^{111, 11}_1 ∧ -b^{111, 11}_0)
c  in CNF:
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_2
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨  b^{111, 11}_1
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ -p_1110 ∨ -b^{111, 11}_0
c  in DIMACS:
 19772  19773 -19774 -1110 -19775 0
 19772  19773 -19774 -1110  19776 0
 19772  19773 -19774 -1110 -19777 0

c  2+1 --> break 
c    (-b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 19772 -19773  19774 -1110 1162 0


c  2-1 --> 1
c    (-b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧ -p_1110) -> (-b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧  b^{111, 11}_0)
c  in CNF:
c     b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_2
c     b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_1
c     b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨  b^{111, 11}_0
c  in DIMACS:
 19772 -19773  19774  1110 -19775 0
 19772 -19773  19774  1110 -19776 0
 19772 -19773  19774  1110  19777 0

c  1-1 --> 0
c    (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0 ∧ -p_1110) -> (-b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧ -b^{111, 11}_0)
c  in CNF:
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_2
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_1
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_0
c  in DIMACS:
 19772  19773 -19774  1110 -19775 0
 19772  19773 -19774  1110 -19776 0
 19772  19773 -19774  1110 -19777 0

c  0-1 --> -1
c    (-b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧ -p_1110) -> ( b^{111, 11}_2 ∧ -b^{111, 11}_1 ∧  b^{111, 11}_0)
c  in CNF:
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨  b^{111, 11}_2
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_1
c     b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨  b^{111, 11}_0
c  in DIMACS:
 19772  19773  19774  1110  19775 0
 19772  19773  19774  1110 -19776 0
 19772  19773  19774  1110  19777 0

c  -1-1 --> -2
c    ( b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧  b^{111, 10}_0 ∧ -p_1110) -> ( b^{111, 11}_2 ∧  b^{111, 11}_1 ∧ -b^{111, 11}_0)
c  in CNF:
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨  b^{111, 11}_2
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨  b^{111, 11}_1
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨  p_1110 ∨ -b^{111, 11}_0
c  in DIMACS:
-19772  19773 -19774  1110  19775 0
-19772  19773 -19774  1110  19776 0
-19772  19773 -19774  1110 -19777 0

c  -2-1 --> break 
c    ( b^{111, 10}_2 ∧  b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨  b^{111, 10}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-19772 -19773  19774  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{111, 10}_2 ∧ -b^{111, 10}_1 ∧ -b^{111, 10}_0 ∧ true) 
c  in CNF:
c    -b^{111, 10}_2 ∨  b^{111, 10}_1 ∨  b^{111, 10}_0 ∨ false 
c  in DIMACS:
-19772  19773  19774  0

c  3 does not represent an automaton state.
c    -(-b^{111, 10}_2 ∧  b^{111, 10}_1 ∧  b^{111, 10}_0 ∧ true) 
c  in CNF:
c     b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ false 
c  in DIMACS:
 19772 -19773 -19774  0
c  -3 does not represent an automaton state.
c    -( b^{111, 10}_2 ∧  b^{111, 10}_1 ∧  b^{111, 10}_0 ∧ true) 
c  in CNF:
c    -b^{111, 10}_2 ∨ -b^{111, 10}_1 ∨ -b^{111, 10}_0 ∨ false 
c  in DIMACS:
-19772 -19773 -19774  0

c INIT for k = 112
c    -b^{112, 1}_2
c    -b^{112, 1}_1
c    -b^{112, 1}_0
c  in DIMACS:
-19778 0
-19779 0
-19780 0

c Transitions for k = 112
c i = 1
c  -2+1 --> -1
c    ( b^{112, 1}_2 ∧  b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧  p_112) -> ( b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0)
c  in CNF:
c    -b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨  b^{112, 2}_2
c    -b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_1
c    -b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨  b^{112, 2}_0
c  in DIMACS:
-19778 -19779  19780 -112  19781 0
-19778 -19779  19780 -112 -19782 0
-19778 -19779  19780 -112  19783 0

c  -1+1 --> 0
c    ( b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧  b^{112, 1}_0 ∧  p_112) -> (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧ -b^{112, 2}_0)
c  in CNF:
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_2
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_1
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_0
c  in DIMACS:
-19778  19779 -19780 -112 -19781 0
-19778  19779 -19780 -112 -19782 0
-19778  19779 -19780 -112 -19783 0

c  0+1 --> 1
c    (-b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧  p_112) -> (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0)
c  in CNF:
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_2
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_1
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨  b^{112, 2}_0
c  in DIMACS:
 19778  19779  19780 -112 -19781 0
 19778  19779  19780 -112 -19782 0
 19778  19779  19780 -112  19783 0

c  1+1 --> 2
c    (-b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧  b^{112, 1}_0 ∧  p_112) -> (-b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0)
c  in CNF:
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_2
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨  b^{112, 2}_1
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ -p_112 ∨ -b^{112, 2}_0
c  in DIMACS:
 19778  19779 -19780 -112 -19781 0
 19778  19779 -19780 -112  19782 0
 19778  19779 -19780 -112 -19783 0

c  2+1 --> break 
c    (-b^{112, 1}_2 ∧  b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧  p_112) -> break
c  in CNF:
c     b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ -p_112 ∨ break
c  in DIMACS:
 19778 -19779  19780 -112 1162 0


c  2-1 --> 1
c    (-b^{112, 1}_2 ∧  b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧ -p_112) -> (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0)
c  in CNF:
c     b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_2
c     b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_1
c     b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨  b^{112, 2}_0
c  in DIMACS:
 19778 -19779  19780  112 -19781 0
 19778 -19779  19780  112 -19782 0
 19778 -19779  19780  112  19783 0

c  1-1 --> 0
c    (-b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧  b^{112, 1}_0 ∧ -p_112) -> (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧ -b^{112, 2}_0)
c  in CNF:
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_2
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_1
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_0
c  in DIMACS:
 19778  19779 -19780  112 -19781 0
 19778  19779 -19780  112 -19782 0
 19778  19779 -19780  112 -19783 0

c  0-1 --> -1
c    (-b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧ -p_112) -> ( b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0)
c  in CNF:
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨  b^{112, 2}_2
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_1
c     b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨  b^{112, 2}_0
c  in DIMACS:
 19778  19779  19780  112  19781 0
 19778  19779  19780  112 -19782 0
 19778  19779  19780  112  19783 0

c  -1-1 --> -2
c    ( b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧  b^{112, 1}_0 ∧ -p_112) -> ( b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0)
c  in CNF:
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨  b^{112, 2}_2
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨  b^{112, 2}_1
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨  p_112 ∨ -b^{112, 2}_0
c  in DIMACS:
-19778  19779 -19780  112  19781 0
-19778  19779 -19780  112  19782 0
-19778  19779 -19780  112 -19783 0

c  -2-1 --> break 
c    ( b^{112, 1}_2 ∧  b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧ -p_112) -> break
c  in CNF:
c    -b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨  b^{112, 1}_0 ∨  p_112 ∨ break
c  in DIMACS:
-19778 -19779  19780  112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 1}_2 ∧ -b^{112, 1}_1 ∧ -b^{112, 1}_0 ∧ true) 
c  in CNF:
c    -b^{112, 1}_2 ∨  b^{112, 1}_1 ∨  b^{112, 1}_0 ∨ false 
c  in DIMACS:
-19778  19779  19780  0

c  3 does not represent an automaton state.
c    -(-b^{112, 1}_2 ∧  b^{112, 1}_1 ∧  b^{112, 1}_0 ∧ true) 
c  in CNF:
c     b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ false 
c  in DIMACS:
 19778 -19779 -19780  0
c  -3 does not represent an automaton state.
c    -( b^{112, 1}_2 ∧  b^{112, 1}_1 ∧  b^{112, 1}_0 ∧ true) 
c  in CNF:
c    -b^{112, 1}_2 ∨ -b^{112, 1}_1 ∨ -b^{112, 1}_0 ∨ false 
c  in DIMACS:
-19778 -19779 -19780  0

c i = 2
c  -2+1 --> -1
c    ( b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧  p_224) -> ( b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0)
c  in CNF:
c    -b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨  b^{112, 3}_2
c    -b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_1
c    -b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨  b^{112, 3}_0
c  in DIMACS:
-19781 -19782  19783 -224  19784 0
-19781 -19782  19783 -224 -19785 0
-19781 -19782  19783 -224  19786 0

c  -1+1 --> 0
c    ( b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0 ∧  p_224) -> (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧ -b^{112, 3}_0)
c  in CNF:
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_2
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_1
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_0
c  in DIMACS:
-19781  19782 -19783 -224 -19784 0
-19781  19782 -19783 -224 -19785 0
-19781  19782 -19783 -224 -19786 0

c  0+1 --> 1
c    (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧  p_224) -> (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0)
c  in CNF:
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_2
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_1
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨  b^{112, 3}_0
c  in DIMACS:
 19781  19782  19783 -224 -19784 0
 19781  19782  19783 -224 -19785 0
 19781  19782  19783 -224  19786 0

c  1+1 --> 2
c    (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0 ∧  p_224) -> (-b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0)
c  in CNF:
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_2
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨  b^{112, 3}_1
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ -p_224 ∨ -b^{112, 3}_0
c  in DIMACS:
 19781  19782 -19783 -224 -19784 0
 19781  19782 -19783 -224  19785 0
 19781  19782 -19783 -224 -19786 0

c  2+1 --> break 
c    (-b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧  p_224) -> break
c  in CNF:
c     b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 19781 -19782  19783 -224 1162 0


c  2-1 --> 1
c    (-b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧ -p_224) -> (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0)
c  in CNF:
c     b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_2
c     b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_1
c     b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨  b^{112, 3}_0
c  in DIMACS:
 19781 -19782  19783  224 -19784 0
 19781 -19782  19783  224 -19785 0
 19781 -19782  19783  224  19786 0

c  1-1 --> 0
c    (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0 ∧ -p_224) -> (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧ -b^{112, 3}_0)
c  in CNF:
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_2
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_1
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_0
c  in DIMACS:
 19781  19782 -19783  224 -19784 0
 19781  19782 -19783  224 -19785 0
 19781  19782 -19783  224 -19786 0

c  0-1 --> -1
c    (-b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧ -p_224) -> ( b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0)
c  in CNF:
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨  b^{112, 3}_2
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_1
c     b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨  b^{112, 3}_0
c  in DIMACS:
 19781  19782  19783  224  19784 0
 19781  19782  19783  224 -19785 0
 19781  19782  19783  224  19786 0

c  -1-1 --> -2
c    ( b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧  b^{112, 2}_0 ∧ -p_224) -> ( b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0)
c  in CNF:
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨  b^{112, 3}_2
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨  b^{112, 3}_1
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨  p_224 ∨ -b^{112, 3}_0
c  in DIMACS:
-19781  19782 -19783  224  19784 0
-19781  19782 -19783  224  19785 0
-19781  19782 -19783  224 -19786 0

c  -2-1 --> break 
c    ( b^{112, 2}_2 ∧  b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨  b^{112, 2}_0 ∨  p_224 ∨ break
c  in DIMACS:
-19781 -19782  19783  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 2}_2 ∧ -b^{112, 2}_1 ∧ -b^{112, 2}_0 ∧ true) 
c  in CNF:
c    -b^{112, 2}_2 ∨  b^{112, 2}_1 ∨  b^{112, 2}_0 ∨ false 
c  in DIMACS:
-19781  19782  19783  0

c  3 does not represent an automaton state.
c    -(-b^{112, 2}_2 ∧  b^{112, 2}_1 ∧  b^{112, 2}_0 ∧ true) 
c  in CNF:
c     b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ false 
c  in DIMACS:
 19781 -19782 -19783  0
c  -3 does not represent an automaton state.
c    -( b^{112, 2}_2 ∧  b^{112, 2}_1 ∧  b^{112, 2}_0 ∧ true) 
c  in CNF:
c    -b^{112, 2}_2 ∨ -b^{112, 2}_1 ∨ -b^{112, 2}_0 ∨ false 
c  in DIMACS:
-19781 -19782 -19783  0

c i = 3
c  -2+1 --> -1
c    ( b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧  p_336) -> ( b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0)
c  in CNF:
c    -b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨  b^{112, 4}_2
c    -b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_1
c    -b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨  b^{112, 4}_0
c  in DIMACS:
-19784 -19785  19786 -336  19787 0
-19784 -19785  19786 -336 -19788 0
-19784 -19785  19786 -336  19789 0

c  -1+1 --> 0
c    ( b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0 ∧  p_336) -> (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧ -b^{112, 4}_0)
c  in CNF:
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_2
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_1
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_0
c  in DIMACS:
-19784  19785 -19786 -336 -19787 0
-19784  19785 -19786 -336 -19788 0
-19784  19785 -19786 -336 -19789 0

c  0+1 --> 1
c    (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧  p_336) -> (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0)
c  in CNF:
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_2
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_1
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨  b^{112, 4}_0
c  in DIMACS:
 19784  19785  19786 -336 -19787 0
 19784  19785  19786 -336 -19788 0
 19784  19785  19786 -336  19789 0

c  1+1 --> 2
c    (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0 ∧  p_336) -> (-b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0)
c  in CNF:
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_2
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨  b^{112, 4}_1
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ -p_336 ∨ -b^{112, 4}_0
c  in DIMACS:
 19784  19785 -19786 -336 -19787 0
 19784  19785 -19786 -336  19788 0
 19784  19785 -19786 -336 -19789 0

c  2+1 --> break 
c    (-b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧  p_336) -> break
c  in CNF:
c     b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 19784 -19785  19786 -336 1162 0


c  2-1 --> 1
c    (-b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧ -p_336) -> (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0)
c  in CNF:
c     b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_2
c     b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_1
c     b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨  b^{112, 4}_0
c  in DIMACS:
 19784 -19785  19786  336 -19787 0
 19784 -19785  19786  336 -19788 0
 19784 -19785  19786  336  19789 0

c  1-1 --> 0
c    (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0 ∧ -p_336) -> (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧ -b^{112, 4}_0)
c  in CNF:
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_2
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_1
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_0
c  in DIMACS:
 19784  19785 -19786  336 -19787 0
 19784  19785 -19786  336 -19788 0
 19784  19785 -19786  336 -19789 0

c  0-1 --> -1
c    (-b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧ -p_336) -> ( b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0)
c  in CNF:
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨  b^{112, 4}_2
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_1
c     b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨  b^{112, 4}_0
c  in DIMACS:
 19784  19785  19786  336  19787 0
 19784  19785  19786  336 -19788 0
 19784  19785  19786  336  19789 0

c  -1-1 --> -2
c    ( b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧  b^{112, 3}_0 ∧ -p_336) -> ( b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0)
c  in CNF:
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨  b^{112, 4}_2
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨  b^{112, 4}_1
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨  p_336 ∨ -b^{112, 4}_0
c  in DIMACS:
-19784  19785 -19786  336  19787 0
-19784  19785 -19786  336  19788 0
-19784  19785 -19786  336 -19789 0

c  -2-1 --> break 
c    ( b^{112, 3}_2 ∧  b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨  b^{112, 3}_0 ∨  p_336 ∨ break
c  in DIMACS:
-19784 -19785  19786  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 3}_2 ∧ -b^{112, 3}_1 ∧ -b^{112, 3}_0 ∧ true) 
c  in CNF:
c    -b^{112, 3}_2 ∨  b^{112, 3}_1 ∨  b^{112, 3}_0 ∨ false 
c  in DIMACS:
-19784  19785  19786  0

c  3 does not represent an automaton state.
c    -(-b^{112, 3}_2 ∧  b^{112, 3}_1 ∧  b^{112, 3}_0 ∧ true) 
c  in CNF:
c     b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ false 
c  in DIMACS:
 19784 -19785 -19786  0
c  -3 does not represent an automaton state.
c    -( b^{112, 3}_2 ∧  b^{112, 3}_1 ∧  b^{112, 3}_0 ∧ true) 
c  in CNF:
c    -b^{112, 3}_2 ∨ -b^{112, 3}_1 ∨ -b^{112, 3}_0 ∨ false 
c  in DIMACS:
-19784 -19785 -19786  0

c i = 4
c  -2+1 --> -1
c    ( b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧  p_448) -> ( b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0)
c  in CNF:
c    -b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨  b^{112, 5}_2
c    -b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_1
c    -b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨  b^{112, 5}_0
c  in DIMACS:
-19787 -19788  19789 -448  19790 0
-19787 -19788  19789 -448 -19791 0
-19787 -19788  19789 -448  19792 0

c  -1+1 --> 0
c    ( b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0 ∧  p_448) -> (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧ -b^{112, 5}_0)
c  in CNF:
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_2
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_1
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_0
c  in DIMACS:
-19787  19788 -19789 -448 -19790 0
-19787  19788 -19789 -448 -19791 0
-19787  19788 -19789 -448 -19792 0

c  0+1 --> 1
c    (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧  p_448) -> (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0)
c  in CNF:
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_2
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_1
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨  b^{112, 5}_0
c  in DIMACS:
 19787  19788  19789 -448 -19790 0
 19787  19788  19789 -448 -19791 0
 19787  19788  19789 -448  19792 0

c  1+1 --> 2
c    (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0 ∧  p_448) -> (-b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0)
c  in CNF:
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_2
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨  b^{112, 5}_1
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ -p_448 ∨ -b^{112, 5}_0
c  in DIMACS:
 19787  19788 -19789 -448 -19790 0
 19787  19788 -19789 -448  19791 0
 19787  19788 -19789 -448 -19792 0

c  2+1 --> break 
c    (-b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧  p_448) -> break
c  in CNF:
c     b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 19787 -19788  19789 -448 1162 0


c  2-1 --> 1
c    (-b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧ -p_448) -> (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0)
c  in CNF:
c     b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_2
c     b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_1
c     b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨  b^{112, 5}_0
c  in DIMACS:
 19787 -19788  19789  448 -19790 0
 19787 -19788  19789  448 -19791 0
 19787 -19788  19789  448  19792 0

c  1-1 --> 0
c    (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0 ∧ -p_448) -> (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧ -b^{112, 5}_0)
c  in CNF:
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_2
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_1
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_0
c  in DIMACS:
 19787  19788 -19789  448 -19790 0
 19787  19788 -19789  448 -19791 0
 19787  19788 -19789  448 -19792 0

c  0-1 --> -1
c    (-b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧ -p_448) -> ( b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0)
c  in CNF:
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨  b^{112, 5}_2
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_1
c     b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨  b^{112, 5}_0
c  in DIMACS:
 19787  19788  19789  448  19790 0
 19787  19788  19789  448 -19791 0
 19787  19788  19789  448  19792 0

c  -1-1 --> -2
c    ( b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧  b^{112, 4}_0 ∧ -p_448) -> ( b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0)
c  in CNF:
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨  b^{112, 5}_2
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨  b^{112, 5}_1
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨  p_448 ∨ -b^{112, 5}_0
c  in DIMACS:
-19787  19788 -19789  448  19790 0
-19787  19788 -19789  448  19791 0
-19787  19788 -19789  448 -19792 0

c  -2-1 --> break 
c    ( b^{112, 4}_2 ∧  b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨  b^{112, 4}_0 ∨  p_448 ∨ break
c  in DIMACS:
-19787 -19788  19789  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 4}_2 ∧ -b^{112, 4}_1 ∧ -b^{112, 4}_0 ∧ true) 
c  in CNF:
c    -b^{112, 4}_2 ∨  b^{112, 4}_1 ∨  b^{112, 4}_0 ∨ false 
c  in DIMACS:
-19787  19788  19789  0

c  3 does not represent an automaton state.
c    -(-b^{112, 4}_2 ∧  b^{112, 4}_1 ∧  b^{112, 4}_0 ∧ true) 
c  in CNF:
c     b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ false 
c  in DIMACS:
 19787 -19788 -19789  0
c  -3 does not represent an automaton state.
c    -( b^{112, 4}_2 ∧  b^{112, 4}_1 ∧  b^{112, 4}_0 ∧ true) 
c  in CNF:
c    -b^{112, 4}_2 ∨ -b^{112, 4}_1 ∨ -b^{112, 4}_0 ∨ false 
c  in DIMACS:
-19787 -19788 -19789  0

c i = 5
c  -2+1 --> -1
c    ( b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧  p_560) -> ( b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0)
c  in CNF:
c    -b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨  b^{112, 6}_2
c    -b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_1
c    -b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨  b^{112, 6}_0
c  in DIMACS:
-19790 -19791  19792 -560  19793 0
-19790 -19791  19792 -560 -19794 0
-19790 -19791  19792 -560  19795 0

c  -1+1 --> 0
c    ( b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0 ∧  p_560) -> (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧ -b^{112, 6}_0)
c  in CNF:
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_2
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_1
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_0
c  in DIMACS:
-19790  19791 -19792 -560 -19793 0
-19790  19791 -19792 -560 -19794 0
-19790  19791 -19792 -560 -19795 0

c  0+1 --> 1
c    (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧  p_560) -> (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0)
c  in CNF:
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_2
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_1
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨  b^{112, 6}_0
c  in DIMACS:
 19790  19791  19792 -560 -19793 0
 19790  19791  19792 -560 -19794 0
 19790  19791  19792 -560  19795 0

c  1+1 --> 2
c    (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0 ∧  p_560) -> (-b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0)
c  in CNF:
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_2
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨  b^{112, 6}_1
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ -p_560 ∨ -b^{112, 6}_0
c  in DIMACS:
 19790  19791 -19792 -560 -19793 0
 19790  19791 -19792 -560  19794 0
 19790  19791 -19792 -560 -19795 0

c  2+1 --> break 
c    (-b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧  p_560) -> break
c  in CNF:
c     b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 19790 -19791  19792 -560 1162 0


c  2-1 --> 1
c    (-b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧ -p_560) -> (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0)
c  in CNF:
c     b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_2
c     b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_1
c     b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨  b^{112, 6}_0
c  in DIMACS:
 19790 -19791  19792  560 -19793 0
 19790 -19791  19792  560 -19794 0
 19790 -19791  19792  560  19795 0

c  1-1 --> 0
c    (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0 ∧ -p_560) -> (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧ -b^{112, 6}_0)
c  in CNF:
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_2
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_1
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_0
c  in DIMACS:
 19790  19791 -19792  560 -19793 0
 19790  19791 -19792  560 -19794 0
 19790  19791 -19792  560 -19795 0

c  0-1 --> -1
c    (-b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧ -p_560) -> ( b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0)
c  in CNF:
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨  b^{112, 6}_2
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_1
c     b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨  b^{112, 6}_0
c  in DIMACS:
 19790  19791  19792  560  19793 0
 19790  19791  19792  560 -19794 0
 19790  19791  19792  560  19795 0

c  -1-1 --> -2
c    ( b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧  b^{112, 5}_0 ∧ -p_560) -> ( b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0)
c  in CNF:
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨  b^{112, 6}_2
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨  b^{112, 6}_1
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨  p_560 ∨ -b^{112, 6}_0
c  in DIMACS:
-19790  19791 -19792  560  19793 0
-19790  19791 -19792  560  19794 0
-19790  19791 -19792  560 -19795 0

c  -2-1 --> break 
c    ( b^{112, 5}_2 ∧  b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨  b^{112, 5}_0 ∨  p_560 ∨ break
c  in DIMACS:
-19790 -19791  19792  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 5}_2 ∧ -b^{112, 5}_1 ∧ -b^{112, 5}_0 ∧ true) 
c  in CNF:
c    -b^{112, 5}_2 ∨  b^{112, 5}_1 ∨  b^{112, 5}_0 ∨ false 
c  in DIMACS:
-19790  19791  19792  0

c  3 does not represent an automaton state.
c    -(-b^{112, 5}_2 ∧  b^{112, 5}_1 ∧  b^{112, 5}_0 ∧ true) 
c  in CNF:
c     b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ false 
c  in DIMACS:
 19790 -19791 -19792  0
c  -3 does not represent an automaton state.
c    -( b^{112, 5}_2 ∧  b^{112, 5}_1 ∧  b^{112, 5}_0 ∧ true) 
c  in CNF:
c    -b^{112, 5}_2 ∨ -b^{112, 5}_1 ∨ -b^{112, 5}_0 ∨ false 
c  in DIMACS:
-19790 -19791 -19792  0

c i = 6
c  -2+1 --> -1
c    ( b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧  p_672) -> ( b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0)
c  in CNF:
c    -b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨  b^{112, 7}_2
c    -b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_1
c    -b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨  b^{112, 7}_0
c  in DIMACS:
-19793 -19794  19795 -672  19796 0
-19793 -19794  19795 -672 -19797 0
-19793 -19794  19795 -672  19798 0

c  -1+1 --> 0
c    ( b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0 ∧  p_672) -> (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧ -b^{112, 7}_0)
c  in CNF:
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_2
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_1
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_0
c  in DIMACS:
-19793  19794 -19795 -672 -19796 0
-19793  19794 -19795 -672 -19797 0
-19793  19794 -19795 -672 -19798 0

c  0+1 --> 1
c    (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧  p_672) -> (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0)
c  in CNF:
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_2
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_1
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨  b^{112, 7}_0
c  in DIMACS:
 19793  19794  19795 -672 -19796 0
 19793  19794  19795 -672 -19797 0
 19793  19794  19795 -672  19798 0

c  1+1 --> 2
c    (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0 ∧  p_672) -> (-b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0)
c  in CNF:
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_2
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨  b^{112, 7}_1
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ -p_672 ∨ -b^{112, 7}_0
c  in DIMACS:
 19793  19794 -19795 -672 -19796 0
 19793  19794 -19795 -672  19797 0
 19793  19794 -19795 -672 -19798 0

c  2+1 --> break 
c    (-b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧  p_672) -> break
c  in CNF:
c     b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 19793 -19794  19795 -672 1162 0


c  2-1 --> 1
c    (-b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧ -p_672) -> (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0)
c  in CNF:
c     b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_2
c     b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_1
c     b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨  b^{112, 7}_0
c  in DIMACS:
 19793 -19794  19795  672 -19796 0
 19793 -19794  19795  672 -19797 0
 19793 -19794  19795  672  19798 0

c  1-1 --> 0
c    (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0 ∧ -p_672) -> (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧ -b^{112, 7}_0)
c  in CNF:
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_2
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_1
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_0
c  in DIMACS:
 19793  19794 -19795  672 -19796 0
 19793  19794 -19795  672 -19797 0
 19793  19794 -19795  672 -19798 0

c  0-1 --> -1
c    (-b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧ -p_672) -> ( b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0)
c  in CNF:
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨  b^{112, 7}_2
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_1
c     b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨  b^{112, 7}_0
c  in DIMACS:
 19793  19794  19795  672  19796 0
 19793  19794  19795  672 -19797 0
 19793  19794  19795  672  19798 0

c  -1-1 --> -2
c    ( b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧  b^{112, 6}_0 ∧ -p_672) -> ( b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0)
c  in CNF:
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨  b^{112, 7}_2
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨  b^{112, 7}_1
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨  p_672 ∨ -b^{112, 7}_0
c  in DIMACS:
-19793  19794 -19795  672  19796 0
-19793  19794 -19795  672  19797 0
-19793  19794 -19795  672 -19798 0

c  -2-1 --> break 
c    ( b^{112, 6}_2 ∧  b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨  b^{112, 6}_0 ∨  p_672 ∨ break
c  in DIMACS:
-19793 -19794  19795  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 6}_2 ∧ -b^{112, 6}_1 ∧ -b^{112, 6}_0 ∧ true) 
c  in CNF:
c    -b^{112, 6}_2 ∨  b^{112, 6}_1 ∨  b^{112, 6}_0 ∨ false 
c  in DIMACS:
-19793  19794  19795  0

c  3 does not represent an automaton state.
c    -(-b^{112, 6}_2 ∧  b^{112, 6}_1 ∧  b^{112, 6}_0 ∧ true) 
c  in CNF:
c     b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ false 
c  in DIMACS:
 19793 -19794 -19795  0
c  -3 does not represent an automaton state.
c    -( b^{112, 6}_2 ∧  b^{112, 6}_1 ∧  b^{112, 6}_0 ∧ true) 
c  in CNF:
c    -b^{112, 6}_2 ∨ -b^{112, 6}_1 ∨ -b^{112, 6}_0 ∨ false 
c  in DIMACS:
-19793 -19794 -19795  0

c i = 7
c  -2+1 --> -1
c    ( b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧  p_784) -> ( b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0)
c  in CNF:
c    -b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨  b^{112, 8}_2
c    -b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_1
c    -b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨  b^{112, 8}_0
c  in DIMACS:
-19796 -19797  19798 -784  19799 0
-19796 -19797  19798 -784 -19800 0
-19796 -19797  19798 -784  19801 0

c  -1+1 --> 0
c    ( b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0 ∧  p_784) -> (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧ -b^{112, 8}_0)
c  in CNF:
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_2
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_1
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_0
c  in DIMACS:
-19796  19797 -19798 -784 -19799 0
-19796  19797 -19798 -784 -19800 0
-19796  19797 -19798 -784 -19801 0

c  0+1 --> 1
c    (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧  p_784) -> (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0)
c  in CNF:
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_2
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_1
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨  b^{112, 8}_0
c  in DIMACS:
 19796  19797  19798 -784 -19799 0
 19796  19797  19798 -784 -19800 0
 19796  19797  19798 -784  19801 0

c  1+1 --> 2
c    (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0 ∧  p_784) -> (-b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0)
c  in CNF:
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_2
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨  b^{112, 8}_1
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ -p_784 ∨ -b^{112, 8}_0
c  in DIMACS:
 19796  19797 -19798 -784 -19799 0
 19796  19797 -19798 -784  19800 0
 19796  19797 -19798 -784 -19801 0

c  2+1 --> break 
c    (-b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧  p_784) -> break
c  in CNF:
c     b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 19796 -19797  19798 -784 1162 0


c  2-1 --> 1
c    (-b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧ -p_784) -> (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0)
c  in CNF:
c     b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_2
c     b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_1
c     b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨  b^{112, 8}_0
c  in DIMACS:
 19796 -19797  19798  784 -19799 0
 19796 -19797  19798  784 -19800 0
 19796 -19797  19798  784  19801 0

c  1-1 --> 0
c    (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0 ∧ -p_784) -> (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧ -b^{112, 8}_0)
c  in CNF:
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_2
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_1
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_0
c  in DIMACS:
 19796  19797 -19798  784 -19799 0
 19796  19797 -19798  784 -19800 0
 19796  19797 -19798  784 -19801 0

c  0-1 --> -1
c    (-b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧ -p_784) -> ( b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0)
c  in CNF:
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨  b^{112, 8}_2
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_1
c     b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨  b^{112, 8}_0
c  in DIMACS:
 19796  19797  19798  784  19799 0
 19796  19797  19798  784 -19800 0
 19796  19797  19798  784  19801 0

c  -1-1 --> -2
c    ( b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧  b^{112, 7}_0 ∧ -p_784) -> ( b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0)
c  in CNF:
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨  b^{112, 8}_2
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨  b^{112, 8}_1
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨  p_784 ∨ -b^{112, 8}_0
c  in DIMACS:
-19796  19797 -19798  784  19799 0
-19796  19797 -19798  784  19800 0
-19796  19797 -19798  784 -19801 0

c  -2-1 --> break 
c    ( b^{112, 7}_2 ∧  b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨  b^{112, 7}_0 ∨  p_784 ∨ break
c  in DIMACS:
-19796 -19797  19798  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 7}_2 ∧ -b^{112, 7}_1 ∧ -b^{112, 7}_0 ∧ true) 
c  in CNF:
c    -b^{112, 7}_2 ∨  b^{112, 7}_1 ∨  b^{112, 7}_0 ∨ false 
c  in DIMACS:
-19796  19797  19798  0

c  3 does not represent an automaton state.
c    -(-b^{112, 7}_2 ∧  b^{112, 7}_1 ∧  b^{112, 7}_0 ∧ true) 
c  in CNF:
c     b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ false 
c  in DIMACS:
 19796 -19797 -19798  0
c  -3 does not represent an automaton state.
c    -( b^{112, 7}_2 ∧  b^{112, 7}_1 ∧  b^{112, 7}_0 ∧ true) 
c  in CNF:
c    -b^{112, 7}_2 ∨ -b^{112, 7}_1 ∨ -b^{112, 7}_0 ∨ false 
c  in DIMACS:
-19796 -19797 -19798  0

c i = 8
c  -2+1 --> -1
c    ( b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧  p_896) -> ( b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0)
c  in CNF:
c    -b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨  b^{112, 9}_2
c    -b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_1
c    -b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨  b^{112, 9}_0
c  in DIMACS:
-19799 -19800  19801 -896  19802 0
-19799 -19800  19801 -896 -19803 0
-19799 -19800  19801 -896  19804 0

c  -1+1 --> 0
c    ( b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0 ∧  p_896) -> (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧ -b^{112, 9}_0)
c  in CNF:
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_2
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_1
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_0
c  in DIMACS:
-19799  19800 -19801 -896 -19802 0
-19799  19800 -19801 -896 -19803 0
-19799  19800 -19801 -896 -19804 0

c  0+1 --> 1
c    (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧  p_896) -> (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0)
c  in CNF:
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_2
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_1
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨  b^{112, 9}_0
c  in DIMACS:
 19799  19800  19801 -896 -19802 0
 19799  19800  19801 -896 -19803 0
 19799  19800  19801 -896  19804 0

c  1+1 --> 2
c    (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0 ∧  p_896) -> (-b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0)
c  in CNF:
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_2
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨  b^{112, 9}_1
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ -p_896 ∨ -b^{112, 9}_0
c  in DIMACS:
 19799  19800 -19801 -896 -19802 0
 19799  19800 -19801 -896  19803 0
 19799  19800 -19801 -896 -19804 0

c  2+1 --> break 
c    (-b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧  p_896) -> break
c  in CNF:
c     b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 19799 -19800  19801 -896 1162 0


c  2-1 --> 1
c    (-b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧ -p_896) -> (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0)
c  in CNF:
c     b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_2
c     b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_1
c     b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨  b^{112, 9}_0
c  in DIMACS:
 19799 -19800  19801  896 -19802 0
 19799 -19800  19801  896 -19803 0
 19799 -19800  19801  896  19804 0

c  1-1 --> 0
c    (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0 ∧ -p_896) -> (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧ -b^{112, 9}_0)
c  in CNF:
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_2
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_1
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_0
c  in DIMACS:
 19799  19800 -19801  896 -19802 0
 19799  19800 -19801  896 -19803 0
 19799  19800 -19801  896 -19804 0

c  0-1 --> -1
c    (-b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧ -p_896) -> ( b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0)
c  in CNF:
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨  b^{112, 9}_2
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_1
c     b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨  b^{112, 9}_0
c  in DIMACS:
 19799  19800  19801  896  19802 0
 19799  19800  19801  896 -19803 0
 19799  19800  19801  896  19804 0

c  -1-1 --> -2
c    ( b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧  b^{112, 8}_0 ∧ -p_896) -> ( b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0)
c  in CNF:
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨  b^{112, 9}_2
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨  b^{112, 9}_1
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨  p_896 ∨ -b^{112, 9}_0
c  in DIMACS:
-19799  19800 -19801  896  19802 0
-19799  19800 -19801  896  19803 0
-19799  19800 -19801  896 -19804 0

c  -2-1 --> break 
c    ( b^{112, 8}_2 ∧  b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨  b^{112, 8}_0 ∨  p_896 ∨ break
c  in DIMACS:
-19799 -19800  19801  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 8}_2 ∧ -b^{112, 8}_1 ∧ -b^{112, 8}_0 ∧ true) 
c  in CNF:
c    -b^{112, 8}_2 ∨  b^{112, 8}_1 ∨  b^{112, 8}_0 ∨ false 
c  in DIMACS:
-19799  19800  19801  0

c  3 does not represent an automaton state.
c    -(-b^{112, 8}_2 ∧  b^{112, 8}_1 ∧  b^{112, 8}_0 ∧ true) 
c  in CNF:
c     b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ false 
c  in DIMACS:
 19799 -19800 -19801  0
c  -3 does not represent an automaton state.
c    -( b^{112, 8}_2 ∧  b^{112, 8}_1 ∧  b^{112, 8}_0 ∧ true) 
c  in CNF:
c    -b^{112, 8}_2 ∨ -b^{112, 8}_1 ∨ -b^{112, 8}_0 ∨ false 
c  in DIMACS:
-19799 -19800 -19801  0

c i = 9
c  -2+1 --> -1
c    ( b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧  p_1008) -> ( b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0)
c  in CNF:
c    -b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨  b^{112, 10}_2
c    -b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_1
c    -b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨  b^{112, 10}_0
c  in DIMACS:
-19802 -19803  19804 -1008  19805 0
-19802 -19803  19804 -1008 -19806 0
-19802 -19803  19804 -1008  19807 0

c  -1+1 --> 0
c    ( b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0 ∧  p_1008) -> (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧ -b^{112, 10}_0)
c  in CNF:
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_2
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_1
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_0
c  in DIMACS:
-19802  19803 -19804 -1008 -19805 0
-19802  19803 -19804 -1008 -19806 0
-19802  19803 -19804 -1008 -19807 0

c  0+1 --> 1
c    (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧  p_1008) -> (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0)
c  in CNF:
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_2
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_1
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨  b^{112, 10}_0
c  in DIMACS:
 19802  19803  19804 -1008 -19805 0
 19802  19803  19804 -1008 -19806 0
 19802  19803  19804 -1008  19807 0

c  1+1 --> 2
c    (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0 ∧  p_1008) -> (-b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0)
c  in CNF:
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_2
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨  b^{112, 10}_1
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ -p_1008 ∨ -b^{112, 10}_0
c  in DIMACS:
 19802  19803 -19804 -1008 -19805 0
 19802  19803 -19804 -1008  19806 0
 19802  19803 -19804 -1008 -19807 0

c  2+1 --> break 
c    (-b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 19802 -19803  19804 -1008 1162 0


c  2-1 --> 1
c    (-b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧ -p_1008) -> (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0)
c  in CNF:
c     b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_2
c     b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_1
c     b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨  b^{112, 10}_0
c  in DIMACS:
 19802 -19803  19804  1008 -19805 0
 19802 -19803  19804  1008 -19806 0
 19802 -19803  19804  1008  19807 0

c  1-1 --> 0
c    (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0 ∧ -p_1008) -> (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧ -b^{112, 10}_0)
c  in CNF:
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_2
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_1
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_0
c  in DIMACS:
 19802  19803 -19804  1008 -19805 0
 19802  19803 -19804  1008 -19806 0
 19802  19803 -19804  1008 -19807 0

c  0-1 --> -1
c    (-b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧ -p_1008) -> ( b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0)
c  in CNF:
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨  b^{112, 10}_2
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_1
c     b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨  b^{112, 10}_0
c  in DIMACS:
 19802  19803  19804  1008  19805 0
 19802  19803  19804  1008 -19806 0
 19802  19803  19804  1008  19807 0

c  -1-1 --> -2
c    ( b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧  b^{112, 9}_0 ∧ -p_1008) -> ( b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0)
c  in CNF:
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨  b^{112, 10}_2
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨  b^{112, 10}_1
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨  p_1008 ∨ -b^{112, 10}_0
c  in DIMACS:
-19802  19803 -19804  1008  19805 0
-19802  19803 -19804  1008  19806 0
-19802  19803 -19804  1008 -19807 0

c  -2-1 --> break 
c    ( b^{112, 9}_2 ∧  b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨  b^{112, 9}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-19802 -19803  19804  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 9}_2 ∧ -b^{112, 9}_1 ∧ -b^{112, 9}_0 ∧ true) 
c  in CNF:
c    -b^{112, 9}_2 ∨  b^{112, 9}_1 ∨  b^{112, 9}_0 ∨ false 
c  in DIMACS:
-19802  19803  19804  0

c  3 does not represent an automaton state.
c    -(-b^{112, 9}_2 ∧  b^{112, 9}_1 ∧  b^{112, 9}_0 ∧ true) 
c  in CNF:
c     b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ false 
c  in DIMACS:
 19802 -19803 -19804  0
c  -3 does not represent an automaton state.
c    -( b^{112, 9}_2 ∧  b^{112, 9}_1 ∧  b^{112, 9}_0 ∧ true) 
c  in CNF:
c    -b^{112, 9}_2 ∨ -b^{112, 9}_1 ∨ -b^{112, 9}_0 ∨ false 
c  in DIMACS:
-19802 -19803 -19804  0

c i = 10
c  -2+1 --> -1
c    ( b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧  p_1120) -> ( b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧  b^{112, 11}_0)
c  in CNF:
c    -b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨  b^{112, 11}_2
c    -b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_1
c    -b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨  b^{112, 11}_0
c  in DIMACS:
-19805 -19806  19807 -1120  19808 0
-19805 -19806  19807 -1120 -19809 0
-19805 -19806  19807 -1120  19810 0

c  -1+1 --> 0
c    ( b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0 ∧  p_1120) -> (-b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧ -b^{112, 11}_0)
c  in CNF:
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_2
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_1
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_0
c  in DIMACS:
-19805  19806 -19807 -1120 -19808 0
-19805  19806 -19807 -1120 -19809 0
-19805  19806 -19807 -1120 -19810 0

c  0+1 --> 1
c    (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧  p_1120) -> (-b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧  b^{112, 11}_0)
c  in CNF:
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_2
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_1
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨  b^{112, 11}_0
c  in DIMACS:
 19805  19806  19807 -1120 -19808 0
 19805  19806  19807 -1120 -19809 0
 19805  19806  19807 -1120  19810 0

c  1+1 --> 2
c    (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0 ∧  p_1120) -> (-b^{112, 11}_2 ∧  b^{112, 11}_1 ∧ -b^{112, 11}_0)
c  in CNF:
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_2
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨  b^{112, 11}_1
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ -p_1120 ∨ -b^{112, 11}_0
c  in DIMACS:
 19805  19806 -19807 -1120 -19808 0
 19805  19806 -19807 -1120  19809 0
 19805  19806 -19807 -1120 -19810 0

c  2+1 --> break 
c    (-b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 19805 -19806  19807 -1120 1162 0


c  2-1 --> 1
c    (-b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧ -p_1120) -> (-b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧  b^{112, 11}_0)
c  in CNF:
c     b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_2
c     b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_1
c     b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨  b^{112, 11}_0
c  in DIMACS:
 19805 -19806  19807  1120 -19808 0
 19805 -19806  19807  1120 -19809 0
 19805 -19806  19807  1120  19810 0

c  1-1 --> 0
c    (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0 ∧ -p_1120) -> (-b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧ -b^{112, 11}_0)
c  in CNF:
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_2
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_1
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_0
c  in DIMACS:
 19805  19806 -19807  1120 -19808 0
 19805  19806 -19807  1120 -19809 0
 19805  19806 -19807  1120 -19810 0

c  0-1 --> -1
c    (-b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧ -p_1120) -> ( b^{112, 11}_2 ∧ -b^{112, 11}_1 ∧  b^{112, 11}_0)
c  in CNF:
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨  b^{112, 11}_2
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_1
c     b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨  b^{112, 11}_0
c  in DIMACS:
 19805  19806  19807  1120  19808 0
 19805  19806  19807  1120 -19809 0
 19805  19806  19807  1120  19810 0

c  -1-1 --> -2
c    ( b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧  b^{112, 10}_0 ∧ -p_1120) -> ( b^{112, 11}_2 ∧  b^{112, 11}_1 ∧ -b^{112, 11}_0)
c  in CNF:
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨  b^{112, 11}_2
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨  b^{112, 11}_1
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨  p_1120 ∨ -b^{112, 11}_0
c  in DIMACS:
-19805  19806 -19807  1120  19808 0
-19805  19806 -19807  1120  19809 0
-19805  19806 -19807  1120 -19810 0

c  -2-1 --> break 
c    ( b^{112, 10}_2 ∧  b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨  b^{112, 10}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-19805 -19806  19807  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{112, 10}_2 ∧ -b^{112, 10}_1 ∧ -b^{112, 10}_0 ∧ true) 
c  in CNF:
c    -b^{112, 10}_2 ∨  b^{112, 10}_1 ∨  b^{112, 10}_0 ∨ false 
c  in DIMACS:
-19805  19806  19807  0

c  3 does not represent an automaton state.
c    -(-b^{112, 10}_2 ∧  b^{112, 10}_1 ∧  b^{112, 10}_0 ∧ true) 
c  in CNF:
c     b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ false 
c  in DIMACS:
 19805 -19806 -19807  0
c  -3 does not represent an automaton state.
c    -( b^{112, 10}_2 ∧  b^{112, 10}_1 ∧  b^{112, 10}_0 ∧ true) 
c  in CNF:
c    -b^{112, 10}_2 ∨ -b^{112, 10}_1 ∨ -b^{112, 10}_0 ∨ false 
c  in DIMACS:
-19805 -19806 -19807  0

c INIT for k = 113
c    -b^{113, 1}_2
c    -b^{113, 1}_1
c    -b^{113, 1}_0
c  in DIMACS:
-19811 0
-19812 0
-19813 0

c Transitions for k = 113
c i = 1
c  -2+1 --> -1
c    ( b^{113, 1}_2 ∧  b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧  p_113) -> ( b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0)
c  in CNF:
c    -b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨  b^{113, 2}_2
c    -b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_1
c    -b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨  b^{113, 2}_0
c  in DIMACS:
-19811 -19812  19813 -113  19814 0
-19811 -19812  19813 -113 -19815 0
-19811 -19812  19813 -113  19816 0

c  -1+1 --> 0
c    ( b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧  b^{113, 1}_0 ∧  p_113) -> (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧ -b^{113, 2}_0)
c  in CNF:
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_2
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_1
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_0
c  in DIMACS:
-19811  19812 -19813 -113 -19814 0
-19811  19812 -19813 -113 -19815 0
-19811  19812 -19813 -113 -19816 0

c  0+1 --> 1
c    (-b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧  p_113) -> (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0)
c  in CNF:
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_2
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_1
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨  b^{113, 2}_0
c  in DIMACS:
 19811  19812  19813 -113 -19814 0
 19811  19812  19813 -113 -19815 0
 19811  19812  19813 -113  19816 0

c  1+1 --> 2
c    (-b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧  b^{113, 1}_0 ∧  p_113) -> (-b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0)
c  in CNF:
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_2
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨  b^{113, 2}_1
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ -p_113 ∨ -b^{113, 2}_0
c  in DIMACS:
 19811  19812 -19813 -113 -19814 0
 19811  19812 -19813 -113  19815 0
 19811  19812 -19813 -113 -19816 0

c  2+1 --> break 
c    (-b^{113, 1}_2 ∧  b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧  p_113) -> break
c  in CNF:
c     b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ -p_113 ∨ break
c  in DIMACS:
 19811 -19812  19813 -113 1162 0


c  2-1 --> 1
c    (-b^{113, 1}_2 ∧  b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧ -p_113) -> (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0)
c  in CNF:
c     b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_2
c     b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_1
c     b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨  b^{113, 2}_0
c  in DIMACS:
 19811 -19812  19813  113 -19814 0
 19811 -19812  19813  113 -19815 0
 19811 -19812  19813  113  19816 0

c  1-1 --> 0
c    (-b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧  b^{113, 1}_0 ∧ -p_113) -> (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧ -b^{113, 2}_0)
c  in CNF:
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_2
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_1
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_0
c  in DIMACS:
 19811  19812 -19813  113 -19814 0
 19811  19812 -19813  113 -19815 0
 19811  19812 -19813  113 -19816 0

c  0-1 --> -1
c    (-b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧ -p_113) -> ( b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0)
c  in CNF:
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨  b^{113, 2}_2
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_1
c     b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨  b^{113, 2}_0
c  in DIMACS:
 19811  19812  19813  113  19814 0
 19811  19812  19813  113 -19815 0
 19811  19812  19813  113  19816 0

c  -1-1 --> -2
c    ( b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧  b^{113, 1}_0 ∧ -p_113) -> ( b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0)
c  in CNF:
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨  b^{113, 2}_2
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨  b^{113, 2}_1
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨  p_113 ∨ -b^{113, 2}_0
c  in DIMACS:
-19811  19812 -19813  113  19814 0
-19811  19812 -19813  113  19815 0
-19811  19812 -19813  113 -19816 0

c  -2-1 --> break 
c    ( b^{113, 1}_2 ∧  b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧ -p_113) -> break
c  in CNF:
c    -b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨  b^{113, 1}_0 ∨  p_113 ∨ break
c  in DIMACS:
-19811 -19812  19813  113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 1}_2 ∧ -b^{113, 1}_1 ∧ -b^{113, 1}_0 ∧ true) 
c  in CNF:
c    -b^{113, 1}_2 ∨  b^{113, 1}_1 ∨  b^{113, 1}_0 ∨ false 
c  in DIMACS:
-19811  19812  19813  0

c  3 does not represent an automaton state.
c    -(-b^{113, 1}_2 ∧  b^{113, 1}_1 ∧  b^{113, 1}_0 ∧ true) 
c  in CNF:
c     b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ false 
c  in DIMACS:
 19811 -19812 -19813  0
c  -3 does not represent an automaton state.
c    -( b^{113, 1}_2 ∧  b^{113, 1}_1 ∧  b^{113, 1}_0 ∧ true) 
c  in CNF:
c    -b^{113, 1}_2 ∨ -b^{113, 1}_1 ∨ -b^{113, 1}_0 ∨ false 
c  in DIMACS:
-19811 -19812 -19813  0

c i = 2
c  -2+1 --> -1
c    ( b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧  p_226) -> ( b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0)
c  in CNF:
c    -b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨  b^{113, 3}_2
c    -b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_1
c    -b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨  b^{113, 3}_0
c  in DIMACS:
-19814 -19815  19816 -226  19817 0
-19814 -19815  19816 -226 -19818 0
-19814 -19815  19816 -226  19819 0

c  -1+1 --> 0
c    ( b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0 ∧  p_226) -> (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧ -b^{113, 3}_0)
c  in CNF:
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_2
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_1
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_0
c  in DIMACS:
-19814  19815 -19816 -226 -19817 0
-19814  19815 -19816 -226 -19818 0
-19814  19815 -19816 -226 -19819 0

c  0+1 --> 1
c    (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧  p_226) -> (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0)
c  in CNF:
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_2
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_1
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨  b^{113, 3}_0
c  in DIMACS:
 19814  19815  19816 -226 -19817 0
 19814  19815  19816 -226 -19818 0
 19814  19815  19816 -226  19819 0

c  1+1 --> 2
c    (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0 ∧  p_226) -> (-b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0)
c  in CNF:
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_2
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨  b^{113, 3}_1
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ -p_226 ∨ -b^{113, 3}_0
c  in DIMACS:
 19814  19815 -19816 -226 -19817 0
 19814  19815 -19816 -226  19818 0
 19814  19815 -19816 -226 -19819 0

c  2+1 --> break 
c    (-b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧  p_226) -> break
c  in CNF:
c     b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ -p_226 ∨ break
c  in DIMACS:
 19814 -19815  19816 -226 1162 0


c  2-1 --> 1
c    (-b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧ -p_226) -> (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0)
c  in CNF:
c     b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_2
c     b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_1
c     b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨  b^{113, 3}_0
c  in DIMACS:
 19814 -19815  19816  226 -19817 0
 19814 -19815  19816  226 -19818 0
 19814 -19815  19816  226  19819 0

c  1-1 --> 0
c    (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0 ∧ -p_226) -> (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧ -b^{113, 3}_0)
c  in CNF:
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_2
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_1
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_0
c  in DIMACS:
 19814  19815 -19816  226 -19817 0
 19814  19815 -19816  226 -19818 0
 19814  19815 -19816  226 -19819 0

c  0-1 --> -1
c    (-b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧ -p_226) -> ( b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0)
c  in CNF:
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨  b^{113, 3}_2
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_1
c     b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨  b^{113, 3}_0
c  in DIMACS:
 19814  19815  19816  226  19817 0
 19814  19815  19816  226 -19818 0
 19814  19815  19816  226  19819 0

c  -1-1 --> -2
c    ( b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧  b^{113, 2}_0 ∧ -p_226) -> ( b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0)
c  in CNF:
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨  b^{113, 3}_2
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨  b^{113, 3}_1
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨  p_226 ∨ -b^{113, 3}_0
c  in DIMACS:
-19814  19815 -19816  226  19817 0
-19814  19815 -19816  226  19818 0
-19814  19815 -19816  226 -19819 0

c  -2-1 --> break 
c    ( b^{113, 2}_2 ∧  b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧ -p_226) -> break
c  in CNF:
c    -b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨  b^{113, 2}_0 ∨  p_226 ∨ break
c  in DIMACS:
-19814 -19815  19816  226 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 2}_2 ∧ -b^{113, 2}_1 ∧ -b^{113, 2}_0 ∧ true) 
c  in CNF:
c    -b^{113, 2}_2 ∨  b^{113, 2}_1 ∨  b^{113, 2}_0 ∨ false 
c  in DIMACS:
-19814  19815  19816  0

c  3 does not represent an automaton state.
c    -(-b^{113, 2}_2 ∧  b^{113, 2}_1 ∧  b^{113, 2}_0 ∧ true) 
c  in CNF:
c     b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ false 
c  in DIMACS:
 19814 -19815 -19816  0
c  -3 does not represent an automaton state.
c    -( b^{113, 2}_2 ∧  b^{113, 2}_1 ∧  b^{113, 2}_0 ∧ true) 
c  in CNF:
c    -b^{113, 2}_2 ∨ -b^{113, 2}_1 ∨ -b^{113, 2}_0 ∨ false 
c  in DIMACS:
-19814 -19815 -19816  0

c i = 3
c  -2+1 --> -1
c    ( b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧  p_339) -> ( b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0)
c  in CNF:
c    -b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨  b^{113, 4}_2
c    -b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_1
c    -b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨  b^{113, 4}_0
c  in DIMACS:
-19817 -19818  19819 -339  19820 0
-19817 -19818  19819 -339 -19821 0
-19817 -19818  19819 -339  19822 0

c  -1+1 --> 0
c    ( b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0 ∧  p_339) -> (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧ -b^{113, 4}_0)
c  in CNF:
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_2
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_1
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_0
c  in DIMACS:
-19817  19818 -19819 -339 -19820 0
-19817  19818 -19819 -339 -19821 0
-19817  19818 -19819 -339 -19822 0

c  0+1 --> 1
c    (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧  p_339) -> (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0)
c  in CNF:
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_2
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_1
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨  b^{113, 4}_0
c  in DIMACS:
 19817  19818  19819 -339 -19820 0
 19817  19818  19819 -339 -19821 0
 19817  19818  19819 -339  19822 0

c  1+1 --> 2
c    (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0 ∧  p_339) -> (-b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0)
c  in CNF:
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_2
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨  b^{113, 4}_1
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ -p_339 ∨ -b^{113, 4}_0
c  in DIMACS:
 19817  19818 -19819 -339 -19820 0
 19817  19818 -19819 -339  19821 0
 19817  19818 -19819 -339 -19822 0

c  2+1 --> break 
c    (-b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧  p_339) -> break
c  in CNF:
c     b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ -p_339 ∨ break
c  in DIMACS:
 19817 -19818  19819 -339 1162 0


c  2-1 --> 1
c    (-b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧ -p_339) -> (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0)
c  in CNF:
c     b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_2
c     b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_1
c     b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨  b^{113, 4}_0
c  in DIMACS:
 19817 -19818  19819  339 -19820 0
 19817 -19818  19819  339 -19821 0
 19817 -19818  19819  339  19822 0

c  1-1 --> 0
c    (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0 ∧ -p_339) -> (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧ -b^{113, 4}_0)
c  in CNF:
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_2
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_1
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_0
c  in DIMACS:
 19817  19818 -19819  339 -19820 0
 19817  19818 -19819  339 -19821 0
 19817  19818 -19819  339 -19822 0

c  0-1 --> -1
c    (-b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧ -p_339) -> ( b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0)
c  in CNF:
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨  b^{113, 4}_2
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_1
c     b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨  b^{113, 4}_0
c  in DIMACS:
 19817  19818  19819  339  19820 0
 19817  19818  19819  339 -19821 0
 19817  19818  19819  339  19822 0

c  -1-1 --> -2
c    ( b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧  b^{113, 3}_0 ∧ -p_339) -> ( b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0)
c  in CNF:
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨  b^{113, 4}_2
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨  b^{113, 4}_1
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨  p_339 ∨ -b^{113, 4}_0
c  in DIMACS:
-19817  19818 -19819  339  19820 0
-19817  19818 -19819  339  19821 0
-19817  19818 -19819  339 -19822 0

c  -2-1 --> break 
c    ( b^{113, 3}_2 ∧  b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧ -p_339) -> break
c  in CNF:
c    -b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨  b^{113, 3}_0 ∨  p_339 ∨ break
c  in DIMACS:
-19817 -19818  19819  339 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 3}_2 ∧ -b^{113, 3}_1 ∧ -b^{113, 3}_0 ∧ true) 
c  in CNF:
c    -b^{113, 3}_2 ∨  b^{113, 3}_1 ∨  b^{113, 3}_0 ∨ false 
c  in DIMACS:
-19817  19818  19819  0

c  3 does not represent an automaton state.
c    -(-b^{113, 3}_2 ∧  b^{113, 3}_1 ∧  b^{113, 3}_0 ∧ true) 
c  in CNF:
c     b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ false 
c  in DIMACS:
 19817 -19818 -19819  0
c  -3 does not represent an automaton state.
c    -( b^{113, 3}_2 ∧  b^{113, 3}_1 ∧  b^{113, 3}_0 ∧ true) 
c  in CNF:
c    -b^{113, 3}_2 ∨ -b^{113, 3}_1 ∨ -b^{113, 3}_0 ∨ false 
c  in DIMACS:
-19817 -19818 -19819  0

c i = 4
c  -2+1 --> -1
c    ( b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧  p_452) -> ( b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0)
c  in CNF:
c    -b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨  b^{113, 5}_2
c    -b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_1
c    -b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨  b^{113, 5}_0
c  in DIMACS:
-19820 -19821  19822 -452  19823 0
-19820 -19821  19822 -452 -19824 0
-19820 -19821  19822 -452  19825 0

c  -1+1 --> 0
c    ( b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0 ∧  p_452) -> (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧ -b^{113, 5}_0)
c  in CNF:
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_2
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_1
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_0
c  in DIMACS:
-19820  19821 -19822 -452 -19823 0
-19820  19821 -19822 -452 -19824 0
-19820  19821 -19822 -452 -19825 0

c  0+1 --> 1
c    (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧  p_452) -> (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0)
c  in CNF:
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_2
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_1
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨  b^{113, 5}_0
c  in DIMACS:
 19820  19821  19822 -452 -19823 0
 19820  19821  19822 -452 -19824 0
 19820  19821  19822 -452  19825 0

c  1+1 --> 2
c    (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0 ∧  p_452) -> (-b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0)
c  in CNF:
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_2
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨  b^{113, 5}_1
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ -p_452 ∨ -b^{113, 5}_0
c  in DIMACS:
 19820  19821 -19822 -452 -19823 0
 19820  19821 -19822 -452  19824 0
 19820  19821 -19822 -452 -19825 0

c  2+1 --> break 
c    (-b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧  p_452) -> break
c  in CNF:
c     b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ -p_452 ∨ break
c  in DIMACS:
 19820 -19821  19822 -452 1162 0


c  2-1 --> 1
c    (-b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧ -p_452) -> (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0)
c  in CNF:
c     b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_2
c     b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_1
c     b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨  b^{113, 5}_0
c  in DIMACS:
 19820 -19821  19822  452 -19823 0
 19820 -19821  19822  452 -19824 0
 19820 -19821  19822  452  19825 0

c  1-1 --> 0
c    (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0 ∧ -p_452) -> (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧ -b^{113, 5}_0)
c  in CNF:
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_2
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_1
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_0
c  in DIMACS:
 19820  19821 -19822  452 -19823 0
 19820  19821 -19822  452 -19824 0
 19820  19821 -19822  452 -19825 0

c  0-1 --> -1
c    (-b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧ -p_452) -> ( b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0)
c  in CNF:
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨  b^{113, 5}_2
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_1
c     b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨  b^{113, 5}_0
c  in DIMACS:
 19820  19821  19822  452  19823 0
 19820  19821  19822  452 -19824 0
 19820  19821  19822  452  19825 0

c  -1-1 --> -2
c    ( b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧  b^{113, 4}_0 ∧ -p_452) -> ( b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0)
c  in CNF:
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨  b^{113, 5}_2
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨  b^{113, 5}_1
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨  p_452 ∨ -b^{113, 5}_0
c  in DIMACS:
-19820  19821 -19822  452  19823 0
-19820  19821 -19822  452  19824 0
-19820  19821 -19822  452 -19825 0

c  -2-1 --> break 
c    ( b^{113, 4}_2 ∧  b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧ -p_452) -> break
c  in CNF:
c    -b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨  b^{113, 4}_0 ∨  p_452 ∨ break
c  in DIMACS:
-19820 -19821  19822  452 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 4}_2 ∧ -b^{113, 4}_1 ∧ -b^{113, 4}_0 ∧ true) 
c  in CNF:
c    -b^{113, 4}_2 ∨  b^{113, 4}_1 ∨  b^{113, 4}_0 ∨ false 
c  in DIMACS:
-19820  19821  19822  0

c  3 does not represent an automaton state.
c    -(-b^{113, 4}_2 ∧  b^{113, 4}_1 ∧  b^{113, 4}_0 ∧ true) 
c  in CNF:
c     b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ false 
c  in DIMACS:
 19820 -19821 -19822  0
c  -3 does not represent an automaton state.
c    -( b^{113, 4}_2 ∧  b^{113, 4}_1 ∧  b^{113, 4}_0 ∧ true) 
c  in CNF:
c    -b^{113, 4}_2 ∨ -b^{113, 4}_1 ∨ -b^{113, 4}_0 ∨ false 
c  in DIMACS:
-19820 -19821 -19822  0

c i = 5
c  -2+1 --> -1
c    ( b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧  p_565) -> ( b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0)
c  in CNF:
c    -b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨  b^{113, 6}_2
c    -b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_1
c    -b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨  b^{113, 6}_0
c  in DIMACS:
-19823 -19824  19825 -565  19826 0
-19823 -19824  19825 -565 -19827 0
-19823 -19824  19825 -565  19828 0

c  -1+1 --> 0
c    ( b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0 ∧  p_565) -> (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧ -b^{113, 6}_0)
c  in CNF:
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_2
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_1
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_0
c  in DIMACS:
-19823  19824 -19825 -565 -19826 0
-19823  19824 -19825 -565 -19827 0
-19823  19824 -19825 -565 -19828 0

c  0+1 --> 1
c    (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧  p_565) -> (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0)
c  in CNF:
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_2
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_1
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨  b^{113, 6}_0
c  in DIMACS:
 19823  19824  19825 -565 -19826 0
 19823  19824  19825 -565 -19827 0
 19823  19824  19825 -565  19828 0

c  1+1 --> 2
c    (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0 ∧  p_565) -> (-b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0)
c  in CNF:
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_2
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨  b^{113, 6}_1
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ -p_565 ∨ -b^{113, 6}_0
c  in DIMACS:
 19823  19824 -19825 -565 -19826 0
 19823  19824 -19825 -565  19827 0
 19823  19824 -19825 -565 -19828 0

c  2+1 --> break 
c    (-b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧  p_565) -> break
c  in CNF:
c     b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ -p_565 ∨ break
c  in DIMACS:
 19823 -19824  19825 -565 1162 0


c  2-1 --> 1
c    (-b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧ -p_565) -> (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0)
c  in CNF:
c     b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_2
c     b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_1
c     b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨  b^{113, 6}_0
c  in DIMACS:
 19823 -19824  19825  565 -19826 0
 19823 -19824  19825  565 -19827 0
 19823 -19824  19825  565  19828 0

c  1-1 --> 0
c    (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0 ∧ -p_565) -> (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧ -b^{113, 6}_0)
c  in CNF:
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_2
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_1
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_0
c  in DIMACS:
 19823  19824 -19825  565 -19826 0
 19823  19824 -19825  565 -19827 0
 19823  19824 -19825  565 -19828 0

c  0-1 --> -1
c    (-b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧ -p_565) -> ( b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0)
c  in CNF:
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨  b^{113, 6}_2
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_1
c     b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨  b^{113, 6}_0
c  in DIMACS:
 19823  19824  19825  565  19826 0
 19823  19824  19825  565 -19827 0
 19823  19824  19825  565  19828 0

c  -1-1 --> -2
c    ( b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧  b^{113, 5}_0 ∧ -p_565) -> ( b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0)
c  in CNF:
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨  b^{113, 6}_2
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨  b^{113, 6}_1
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨  p_565 ∨ -b^{113, 6}_0
c  in DIMACS:
-19823  19824 -19825  565  19826 0
-19823  19824 -19825  565  19827 0
-19823  19824 -19825  565 -19828 0

c  -2-1 --> break 
c    ( b^{113, 5}_2 ∧  b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧ -p_565) -> break
c  in CNF:
c    -b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨  b^{113, 5}_0 ∨  p_565 ∨ break
c  in DIMACS:
-19823 -19824  19825  565 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 5}_2 ∧ -b^{113, 5}_1 ∧ -b^{113, 5}_0 ∧ true) 
c  in CNF:
c    -b^{113, 5}_2 ∨  b^{113, 5}_1 ∨  b^{113, 5}_0 ∨ false 
c  in DIMACS:
-19823  19824  19825  0

c  3 does not represent an automaton state.
c    -(-b^{113, 5}_2 ∧  b^{113, 5}_1 ∧  b^{113, 5}_0 ∧ true) 
c  in CNF:
c     b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ false 
c  in DIMACS:
 19823 -19824 -19825  0
c  -3 does not represent an automaton state.
c    -( b^{113, 5}_2 ∧  b^{113, 5}_1 ∧  b^{113, 5}_0 ∧ true) 
c  in CNF:
c    -b^{113, 5}_2 ∨ -b^{113, 5}_1 ∨ -b^{113, 5}_0 ∨ false 
c  in DIMACS:
-19823 -19824 -19825  0

c i = 6
c  -2+1 --> -1
c    ( b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧  p_678) -> ( b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0)
c  in CNF:
c    -b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨  b^{113, 7}_2
c    -b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_1
c    -b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨  b^{113, 7}_0
c  in DIMACS:
-19826 -19827  19828 -678  19829 0
-19826 -19827  19828 -678 -19830 0
-19826 -19827  19828 -678  19831 0

c  -1+1 --> 0
c    ( b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0 ∧  p_678) -> (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧ -b^{113, 7}_0)
c  in CNF:
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_2
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_1
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_0
c  in DIMACS:
-19826  19827 -19828 -678 -19829 0
-19826  19827 -19828 -678 -19830 0
-19826  19827 -19828 -678 -19831 0

c  0+1 --> 1
c    (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧  p_678) -> (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0)
c  in CNF:
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_2
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_1
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨  b^{113, 7}_0
c  in DIMACS:
 19826  19827  19828 -678 -19829 0
 19826  19827  19828 -678 -19830 0
 19826  19827  19828 -678  19831 0

c  1+1 --> 2
c    (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0 ∧  p_678) -> (-b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0)
c  in CNF:
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_2
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨  b^{113, 7}_1
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ -p_678 ∨ -b^{113, 7}_0
c  in DIMACS:
 19826  19827 -19828 -678 -19829 0
 19826  19827 -19828 -678  19830 0
 19826  19827 -19828 -678 -19831 0

c  2+1 --> break 
c    (-b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧  p_678) -> break
c  in CNF:
c     b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 19826 -19827  19828 -678 1162 0


c  2-1 --> 1
c    (-b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧ -p_678) -> (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0)
c  in CNF:
c     b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_2
c     b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_1
c     b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨  b^{113, 7}_0
c  in DIMACS:
 19826 -19827  19828  678 -19829 0
 19826 -19827  19828  678 -19830 0
 19826 -19827  19828  678  19831 0

c  1-1 --> 0
c    (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0 ∧ -p_678) -> (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧ -b^{113, 7}_0)
c  in CNF:
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_2
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_1
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_0
c  in DIMACS:
 19826  19827 -19828  678 -19829 0
 19826  19827 -19828  678 -19830 0
 19826  19827 -19828  678 -19831 0

c  0-1 --> -1
c    (-b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧ -p_678) -> ( b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0)
c  in CNF:
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨  b^{113, 7}_2
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_1
c     b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨  b^{113, 7}_0
c  in DIMACS:
 19826  19827  19828  678  19829 0
 19826  19827  19828  678 -19830 0
 19826  19827  19828  678  19831 0

c  -1-1 --> -2
c    ( b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧  b^{113, 6}_0 ∧ -p_678) -> ( b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0)
c  in CNF:
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨  b^{113, 7}_2
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨  b^{113, 7}_1
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨  p_678 ∨ -b^{113, 7}_0
c  in DIMACS:
-19826  19827 -19828  678  19829 0
-19826  19827 -19828  678  19830 0
-19826  19827 -19828  678 -19831 0

c  -2-1 --> break 
c    ( b^{113, 6}_2 ∧  b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨  b^{113, 6}_0 ∨  p_678 ∨ break
c  in DIMACS:
-19826 -19827  19828  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 6}_2 ∧ -b^{113, 6}_1 ∧ -b^{113, 6}_0 ∧ true) 
c  in CNF:
c    -b^{113, 6}_2 ∨  b^{113, 6}_1 ∨  b^{113, 6}_0 ∨ false 
c  in DIMACS:
-19826  19827  19828  0

c  3 does not represent an automaton state.
c    -(-b^{113, 6}_2 ∧  b^{113, 6}_1 ∧  b^{113, 6}_0 ∧ true) 
c  in CNF:
c     b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ false 
c  in DIMACS:
 19826 -19827 -19828  0
c  -3 does not represent an automaton state.
c    -( b^{113, 6}_2 ∧  b^{113, 6}_1 ∧  b^{113, 6}_0 ∧ true) 
c  in CNF:
c    -b^{113, 6}_2 ∨ -b^{113, 6}_1 ∨ -b^{113, 6}_0 ∨ false 
c  in DIMACS:
-19826 -19827 -19828  0

c i = 7
c  -2+1 --> -1
c    ( b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧  p_791) -> ( b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0)
c  in CNF:
c    -b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨  b^{113, 8}_2
c    -b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_1
c    -b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨  b^{113, 8}_0
c  in DIMACS:
-19829 -19830  19831 -791  19832 0
-19829 -19830  19831 -791 -19833 0
-19829 -19830  19831 -791  19834 0

c  -1+1 --> 0
c    ( b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0 ∧  p_791) -> (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧ -b^{113, 8}_0)
c  in CNF:
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_2
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_1
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_0
c  in DIMACS:
-19829  19830 -19831 -791 -19832 0
-19829  19830 -19831 -791 -19833 0
-19829  19830 -19831 -791 -19834 0

c  0+1 --> 1
c    (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧  p_791) -> (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0)
c  in CNF:
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_2
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_1
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨  b^{113, 8}_0
c  in DIMACS:
 19829  19830  19831 -791 -19832 0
 19829  19830  19831 -791 -19833 0
 19829  19830  19831 -791  19834 0

c  1+1 --> 2
c    (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0 ∧  p_791) -> (-b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0)
c  in CNF:
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_2
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨  b^{113, 8}_1
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ -p_791 ∨ -b^{113, 8}_0
c  in DIMACS:
 19829  19830 -19831 -791 -19832 0
 19829  19830 -19831 -791  19833 0
 19829  19830 -19831 -791 -19834 0

c  2+1 --> break 
c    (-b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧  p_791) -> break
c  in CNF:
c     b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ -p_791 ∨ break
c  in DIMACS:
 19829 -19830  19831 -791 1162 0


c  2-1 --> 1
c    (-b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧ -p_791) -> (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0)
c  in CNF:
c     b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_2
c     b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_1
c     b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨  b^{113, 8}_0
c  in DIMACS:
 19829 -19830  19831  791 -19832 0
 19829 -19830  19831  791 -19833 0
 19829 -19830  19831  791  19834 0

c  1-1 --> 0
c    (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0 ∧ -p_791) -> (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧ -b^{113, 8}_0)
c  in CNF:
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_2
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_1
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_0
c  in DIMACS:
 19829  19830 -19831  791 -19832 0
 19829  19830 -19831  791 -19833 0
 19829  19830 -19831  791 -19834 0

c  0-1 --> -1
c    (-b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧ -p_791) -> ( b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0)
c  in CNF:
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨  b^{113, 8}_2
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_1
c     b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨  b^{113, 8}_0
c  in DIMACS:
 19829  19830  19831  791  19832 0
 19829  19830  19831  791 -19833 0
 19829  19830  19831  791  19834 0

c  -1-1 --> -2
c    ( b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧  b^{113, 7}_0 ∧ -p_791) -> ( b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0)
c  in CNF:
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨  b^{113, 8}_2
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨  b^{113, 8}_1
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨  p_791 ∨ -b^{113, 8}_0
c  in DIMACS:
-19829  19830 -19831  791  19832 0
-19829  19830 -19831  791  19833 0
-19829  19830 -19831  791 -19834 0

c  -2-1 --> break 
c    ( b^{113, 7}_2 ∧  b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧ -p_791) -> break
c  in CNF:
c    -b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨  b^{113, 7}_0 ∨  p_791 ∨ break
c  in DIMACS:
-19829 -19830  19831  791 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 7}_2 ∧ -b^{113, 7}_1 ∧ -b^{113, 7}_0 ∧ true) 
c  in CNF:
c    -b^{113, 7}_2 ∨  b^{113, 7}_1 ∨  b^{113, 7}_0 ∨ false 
c  in DIMACS:
-19829  19830  19831  0

c  3 does not represent an automaton state.
c    -(-b^{113, 7}_2 ∧  b^{113, 7}_1 ∧  b^{113, 7}_0 ∧ true) 
c  in CNF:
c     b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ false 
c  in DIMACS:
 19829 -19830 -19831  0
c  -3 does not represent an automaton state.
c    -( b^{113, 7}_2 ∧  b^{113, 7}_1 ∧  b^{113, 7}_0 ∧ true) 
c  in CNF:
c    -b^{113, 7}_2 ∨ -b^{113, 7}_1 ∨ -b^{113, 7}_0 ∨ false 
c  in DIMACS:
-19829 -19830 -19831  0

c i = 8
c  -2+1 --> -1
c    ( b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧  p_904) -> ( b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0)
c  in CNF:
c    -b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨  b^{113, 9}_2
c    -b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_1
c    -b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨  b^{113, 9}_0
c  in DIMACS:
-19832 -19833  19834 -904  19835 0
-19832 -19833  19834 -904 -19836 0
-19832 -19833  19834 -904  19837 0

c  -1+1 --> 0
c    ( b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0 ∧  p_904) -> (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧ -b^{113, 9}_0)
c  in CNF:
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_2
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_1
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_0
c  in DIMACS:
-19832  19833 -19834 -904 -19835 0
-19832  19833 -19834 -904 -19836 0
-19832  19833 -19834 -904 -19837 0

c  0+1 --> 1
c    (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧  p_904) -> (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0)
c  in CNF:
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_2
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_1
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨  b^{113, 9}_0
c  in DIMACS:
 19832  19833  19834 -904 -19835 0
 19832  19833  19834 -904 -19836 0
 19832  19833  19834 -904  19837 0

c  1+1 --> 2
c    (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0 ∧  p_904) -> (-b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0)
c  in CNF:
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_2
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨  b^{113, 9}_1
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ -p_904 ∨ -b^{113, 9}_0
c  in DIMACS:
 19832  19833 -19834 -904 -19835 0
 19832  19833 -19834 -904  19836 0
 19832  19833 -19834 -904 -19837 0

c  2+1 --> break 
c    (-b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧  p_904) -> break
c  in CNF:
c     b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 19832 -19833  19834 -904 1162 0


c  2-1 --> 1
c    (-b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧ -p_904) -> (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0)
c  in CNF:
c     b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_2
c     b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_1
c     b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨  b^{113, 9}_0
c  in DIMACS:
 19832 -19833  19834  904 -19835 0
 19832 -19833  19834  904 -19836 0
 19832 -19833  19834  904  19837 0

c  1-1 --> 0
c    (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0 ∧ -p_904) -> (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧ -b^{113, 9}_0)
c  in CNF:
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_2
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_1
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_0
c  in DIMACS:
 19832  19833 -19834  904 -19835 0
 19832  19833 -19834  904 -19836 0
 19832  19833 -19834  904 -19837 0

c  0-1 --> -1
c    (-b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧ -p_904) -> ( b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0)
c  in CNF:
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨  b^{113, 9}_2
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_1
c     b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨  b^{113, 9}_0
c  in DIMACS:
 19832  19833  19834  904  19835 0
 19832  19833  19834  904 -19836 0
 19832  19833  19834  904  19837 0

c  -1-1 --> -2
c    ( b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧  b^{113, 8}_0 ∧ -p_904) -> ( b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0)
c  in CNF:
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨  b^{113, 9}_2
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨  b^{113, 9}_1
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨  p_904 ∨ -b^{113, 9}_0
c  in DIMACS:
-19832  19833 -19834  904  19835 0
-19832  19833 -19834  904  19836 0
-19832  19833 -19834  904 -19837 0

c  -2-1 --> break 
c    ( b^{113, 8}_2 ∧  b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨  b^{113, 8}_0 ∨  p_904 ∨ break
c  in DIMACS:
-19832 -19833  19834  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 8}_2 ∧ -b^{113, 8}_1 ∧ -b^{113, 8}_0 ∧ true) 
c  in CNF:
c    -b^{113, 8}_2 ∨  b^{113, 8}_1 ∨  b^{113, 8}_0 ∨ false 
c  in DIMACS:
-19832  19833  19834  0

c  3 does not represent an automaton state.
c    -(-b^{113, 8}_2 ∧  b^{113, 8}_1 ∧  b^{113, 8}_0 ∧ true) 
c  in CNF:
c     b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ false 
c  in DIMACS:
 19832 -19833 -19834  0
c  -3 does not represent an automaton state.
c    -( b^{113, 8}_2 ∧  b^{113, 8}_1 ∧  b^{113, 8}_0 ∧ true) 
c  in CNF:
c    -b^{113, 8}_2 ∨ -b^{113, 8}_1 ∨ -b^{113, 8}_0 ∨ false 
c  in DIMACS:
-19832 -19833 -19834  0

c i = 9
c  -2+1 --> -1
c    ( b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧  p_1017) -> ( b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0)
c  in CNF:
c    -b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨  b^{113, 10}_2
c    -b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_1
c    -b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨  b^{113, 10}_0
c  in DIMACS:
-19835 -19836  19837 -1017  19838 0
-19835 -19836  19837 -1017 -19839 0
-19835 -19836  19837 -1017  19840 0

c  -1+1 --> 0
c    ( b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0 ∧  p_1017) -> (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧ -b^{113, 10}_0)
c  in CNF:
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_2
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_1
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_0
c  in DIMACS:
-19835  19836 -19837 -1017 -19838 0
-19835  19836 -19837 -1017 -19839 0
-19835  19836 -19837 -1017 -19840 0

c  0+1 --> 1
c    (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧  p_1017) -> (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0)
c  in CNF:
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_2
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_1
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨  b^{113, 10}_0
c  in DIMACS:
 19835  19836  19837 -1017 -19838 0
 19835  19836  19837 -1017 -19839 0
 19835  19836  19837 -1017  19840 0

c  1+1 --> 2
c    (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0 ∧  p_1017) -> (-b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0)
c  in CNF:
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_2
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨  b^{113, 10}_1
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ -p_1017 ∨ -b^{113, 10}_0
c  in DIMACS:
 19835  19836 -19837 -1017 -19838 0
 19835  19836 -19837 -1017  19839 0
 19835  19836 -19837 -1017 -19840 0

c  2+1 --> break 
c    (-b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧  p_1017) -> break
c  in CNF:
c     b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ -p_1017 ∨ break
c  in DIMACS:
 19835 -19836  19837 -1017 1162 0


c  2-1 --> 1
c    (-b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧ -p_1017) -> (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0)
c  in CNF:
c     b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_2
c     b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_1
c     b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨  b^{113, 10}_0
c  in DIMACS:
 19835 -19836  19837  1017 -19838 0
 19835 -19836  19837  1017 -19839 0
 19835 -19836  19837  1017  19840 0

c  1-1 --> 0
c    (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0 ∧ -p_1017) -> (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧ -b^{113, 10}_0)
c  in CNF:
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_2
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_1
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_0
c  in DIMACS:
 19835  19836 -19837  1017 -19838 0
 19835  19836 -19837  1017 -19839 0
 19835  19836 -19837  1017 -19840 0

c  0-1 --> -1
c    (-b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧ -p_1017) -> ( b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0)
c  in CNF:
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨  b^{113, 10}_2
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_1
c     b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨  b^{113, 10}_0
c  in DIMACS:
 19835  19836  19837  1017  19838 0
 19835  19836  19837  1017 -19839 0
 19835  19836  19837  1017  19840 0

c  -1-1 --> -2
c    ( b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧  b^{113, 9}_0 ∧ -p_1017) -> ( b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0)
c  in CNF:
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨  b^{113, 10}_2
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨  b^{113, 10}_1
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨  p_1017 ∨ -b^{113, 10}_0
c  in DIMACS:
-19835  19836 -19837  1017  19838 0
-19835  19836 -19837  1017  19839 0
-19835  19836 -19837  1017 -19840 0

c  -2-1 --> break 
c    ( b^{113, 9}_2 ∧  b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧ -p_1017) -> break
c  in CNF:
c    -b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨  b^{113, 9}_0 ∨  p_1017 ∨ break
c  in DIMACS:
-19835 -19836  19837  1017 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 9}_2 ∧ -b^{113, 9}_1 ∧ -b^{113, 9}_0 ∧ true) 
c  in CNF:
c    -b^{113, 9}_2 ∨  b^{113, 9}_1 ∨  b^{113, 9}_0 ∨ false 
c  in DIMACS:
-19835  19836  19837  0

c  3 does not represent an automaton state.
c    -(-b^{113, 9}_2 ∧  b^{113, 9}_1 ∧  b^{113, 9}_0 ∧ true) 
c  in CNF:
c     b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ false 
c  in DIMACS:
 19835 -19836 -19837  0
c  -3 does not represent an automaton state.
c    -( b^{113, 9}_2 ∧  b^{113, 9}_1 ∧  b^{113, 9}_0 ∧ true) 
c  in CNF:
c    -b^{113, 9}_2 ∨ -b^{113, 9}_1 ∨ -b^{113, 9}_0 ∨ false 
c  in DIMACS:
-19835 -19836 -19837  0

c i = 10
c  -2+1 --> -1
c    ( b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧  p_1130) -> ( b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧  b^{113, 11}_0)
c  in CNF:
c    -b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨  b^{113, 11}_2
c    -b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_1
c    -b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨  b^{113, 11}_0
c  in DIMACS:
-19838 -19839  19840 -1130  19841 0
-19838 -19839  19840 -1130 -19842 0
-19838 -19839  19840 -1130  19843 0

c  -1+1 --> 0
c    ( b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0 ∧  p_1130) -> (-b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧ -b^{113, 11}_0)
c  in CNF:
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_2
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_1
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_0
c  in DIMACS:
-19838  19839 -19840 -1130 -19841 0
-19838  19839 -19840 -1130 -19842 0
-19838  19839 -19840 -1130 -19843 0

c  0+1 --> 1
c    (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧  p_1130) -> (-b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧  b^{113, 11}_0)
c  in CNF:
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_2
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_1
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨  b^{113, 11}_0
c  in DIMACS:
 19838  19839  19840 -1130 -19841 0
 19838  19839  19840 -1130 -19842 0
 19838  19839  19840 -1130  19843 0

c  1+1 --> 2
c    (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0 ∧  p_1130) -> (-b^{113, 11}_2 ∧  b^{113, 11}_1 ∧ -b^{113, 11}_0)
c  in CNF:
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_2
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨  b^{113, 11}_1
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ -p_1130 ∨ -b^{113, 11}_0
c  in DIMACS:
 19838  19839 -19840 -1130 -19841 0
 19838  19839 -19840 -1130  19842 0
 19838  19839 -19840 -1130 -19843 0

c  2+1 --> break 
c    (-b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 19838 -19839  19840 -1130 1162 0


c  2-1 --> 1
c    (-b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧ -p_1130) -> (-b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧  b^{113, 11}_0)
c  in CNF:
c     b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_2
c     b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_1
c     b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨  b^{113, 11}_0
c  in DIMACS:
 19838 -19839  19840  1130 -19841 0
 19838 -19839  19840  1130 -19842 0
 19838 -19839  19840  1130  19843 0

c  1-1 --> 0
c    (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0 ∧ -p_1130) -> (-b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧ -b^{113, 11}_0)
c  in CNF:
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_2
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_1
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_0
c  in DIMACS:
 19838  19839 -19840  1130 -19841 0
 19838  19839 -19840  1130 -19842 0
 19838  19839 -19840  1130 -19843 0

c  0-1 --> -1
c    (-b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧ -p_1130) -> ( b^{113, 11}_2 ∧ -b^{113, 11}_1 ∧  b^{113, 11}_0)
c  in CNF:
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨  b^{113, 11}_2
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_1
c     b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨  b^{113, 11}_0
c  in DIMACS:
 19838  19839  19840  1130  19841 0
 19838  19839  19840  1130 -19842 0
 19838  19839  19840  1130  19843 0

c  -1-1 --> -2
c    ( b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧  b^{113, 10}_0 ∧ -p_1130) -> ( b^{113, 11}_2 ∧  b^{113, 11}_1 ∧ -b^{113, 11}_0)
c  in CNF:
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨  b^{113, 11}_2
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨  b^{113, 11}_1
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨  p_1130 ∨ -b^{113, 11}_0
c  in DIMACS:
-19838  19839 -19840  1130  19841 0
-19838  19839 -19840  1130  19842 0
-19838  19839 -19840  1130 -19843 0

c  -2-1 --> break 
c    ( b^{113, 10}_2 ∧  b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨  b^{113, 10}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-19838 -19839  19840  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{113, 10}_2 ∧ -b^{113, 10}_1 ∧ -b^{113, 10}_0 ∧ true) 
c  in CNF:
c    -b^{113, 10}_2 ∨  b^{113, 10}_1 ∨  b^{113, 10}_0 ∨ false 
c  in DIMACS:
-19838  19839  19840  0

c  3 does not represent an automaton state.
c    -(-b^{113, 10}_2 ∧  b^{113, 10}_1 ∧  b^{113, 10}_0 ∧ true) 
c  in CNF:
c     b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ false 
c  in DIMACS:
 19838 -19839 -19840  0
c  -3 does not represent an automaton state.
c    -( b^{113, 10}_2 ∧  b^{113, 10}_1 ∧  b^{113, 10}_0 ∧ true) 
c  in CNF:
c    -b^{113, 10}_2 ∨ -b^{113, 10}_1 ∨ -b^{113, 10}_0 ∨ false 
c  in DIMACS:
-19838 -19839 -19840  0

c INIT for k = 114
c    -b^{114, 1}_2
c    -b^{114, 1}_1
c    -b^{114, 1}_0
c  in DIMACS:
-19844 0
-19845 0
-19846 0

c Transitions for k = 114
c i = 1
c  -2+1 --> -1
c    ( b^{114, 1}_2 ∧  b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧  p_114) -> ( b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0)
c  in CNF:
c    -b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨  b^{114, 2}_2
c    -b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_1
c    -b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨  b^{114, 2}_0
c  in DIMACS:
-19844 -19845  19846 -114  19847 0
-19844 -19845  19846 -114 -19848 0
-19844 -19845  19846 -114  19849 0

c  -1+1 --> 0
c    ( b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧  b^{114, 1}_0 ∧  p_114) -> (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧ -b^{114, 2}_0)
c  in CNF:
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_2
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_1
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_0
c  in DIMACS:
-19844  19845 -19846 -114 -19847 0
-19844  19845 -19846 -114 -19848 0
-19844  19845 -19846 -114 -19849 0

c  0+1 --> 1
c    (-b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧  p_114) -> (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0)
c  in CNF:
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_2
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_1
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨  b^{114, 2}_0
c  in DIMACS:
 19844  19845  19846 -114 -19847 0
 19844  19845  19846 -114 -19848 0
 19844  19845  19846 -114  19849 0

c  1+1 --> 2
c    (-b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧  b^{114, 1}_0 ∧  p_114) -> (-b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0)
c  in CNF:
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_2
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨  b^{114, 2}_1
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ -p_114 ∨ -b^{114, 2}_0
c  in DIMACS:
 19844  19845 -19846 -114 -19847 0
 19844  19845 -19846 -114  19848 0
 19844  19845 -19846 -114 -19849 0

c  2+1 --> break 
c    (-b^{114, 1}_2 ∧  b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧  p_114) -> break
c  in CNF:
c     b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ -p_114 ∨ break
c  in DIMACS:
 19844 -19845  19846 -114 1162 0


c  2-1 --> 1
c    (-b^{114, 1}_2 ∧  b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧ -p_114) -> (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0)
c  in CNF:
c     b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_2
c     b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_1
c     b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨  b^{114, 2}_0
c  in DIMACS:
 19844 -19845  19846  114 -19847 0
 19844 -19845  19846  114 -19848 0
 19844 -19845  19846  114  19849 0

c  1-1 --> 0
c    (-b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧  b^{114, 1}_0 ∧ -p_114) -> (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧ -b^{114, 2}_0)
c  in CNF:
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_2
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_1
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_0
c  in DIMACS:
 19844  19845 -19846  114 -19847 0
 19844  19845 -19846  114 -19848 0
 19844  19845 -19846  114 -19849 0

c  0-1 --> -1
c    (-b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧ -p_114) -> ( b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0)
c  in CNF:
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨  b^{114, 2}_2
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_1
c     b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨  b^{114, 2}_0
c  in DIMACS:
 19844  19845  19846  114  19847 0
 19844  19845  19846  114 -19848 0
 19844  19845  19846  114  19849 0

c  -1-1 --> -2
c    ( b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧  b^{114, 1}_0 ∧ -p_114) -> ( b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0)
c  in CNF:
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨  b^{114, 2}_2
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨  b^{114, 2}_1
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨  p_114 ∨ -b^{114, 2}_0
c  in DIMACS:
-19844  19845 -19846  114  19847 0
-19844  19845 -19846  114  19848 0
-19844  19845 -19846  114 -19849 0

c  -2-1 --> break 
c    ( b^{114, 1}_2 ∧  b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧ -p_114) -> break
c  in CNF:
c    -b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨  b^{114, 1}_0 ∨  p_114 ∨ break
c  in DIMACS:
-19844 -19845  19846  114 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 1}_2 ∧ -b^{114, 1}_1 ∧ -b^{114, 1}_0 ∧ true) 
c  in CNF:
c    -b^{114, 1}_2 ∨  b^{114, 1}_1 ∨  b^{114, 1}_0 ∨ false 
c  in DIMACS:
-19844  19845  19846  0

c  3 does not represent an automaton state.
c    -(-b^{114, 1}_2 ∧  b^{114, 1}_1 ∧  b^{114, 1}_0 ∧ true) 
c  in CNF:
c     b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ false 
c  in DIMACS:
 19844 -19845 -19846  0
c  -3 does not represent an automaton state.
c    -( b^{114, 1}_2 ∧  b^{114, 1}_1 ∧  b^{114, 1}_0 ∧ true) 
c  in CNF:
c    -b^{114, 1}_2 ∨ -b^{114, 1}_1 ∨ -b^{114, 1}_0 ∨ false 
c  in DIMACS:
-19844 -19845 -19846  0

c i = 2
c  -2+1 --> -1
c    ( b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧  p_228) -> ( b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0)
c  in CNF:
c    -b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨  b^{114, 3}_2
c    -b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_1
c    -b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨  b^{114, 3}_0
c  in DIMACS:
-19847 -19848  19849 -228  19850 0
-19847 -19848  19849 -228 -19851 0
-19847 -19848  19849 -228  19852 0

c  -1+1 --> 0
c    ( b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0 ∧  p_228) -> (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧ -b^{114, 3}_0)
c  in CNF:
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_2
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_1
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_0
c  in DIMACS:
-19847  19848 -19849 -228 -19850 0
-19847  19848 -19849 -228 -19851 0
-19847  19848 -19849 -228 -19852 0

c  0+1 --> 1
c    (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧  p_228) -> (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0)
c  in CNF:
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_2
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_1
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨  b^{114, 3}_0
c  in DIMACS:
 19847  19848  19849 -228 -19850 0
 19847  19848  19849 -228 -19851 0
 19847  19848  19849 -228  19852 0

c  1+1 --> 2
c    (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0 ∧  p_228) -> (-b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0)
c  in CNF:
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_2
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨  b^{114, 3}_1
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ -p_228 ∨ -b^{114, 3}_0
c  in DIMACS:
 19847  19848 -19849 -228 -19850 0
 19847  19848 -19849 -228  19851 0
 19847  19848 -19849 -228 -19852 0

c  2+1 --> break 
c    (-b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧  p_228) -> break
c  in CNF:
c     b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 19847 -19848  19849 -228 1162 0


c  2-1 --> 1
c    (-b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧ -p_228) -> (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0)
c  in CNF:
c     b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_2
c     b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_1
c     b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨  b^{114, 3}_0
c  in DIMACS:
 19847 -19848  19849  228 -19850 0
 19847 -19848  19849  228 -19851 0
 19847 -19848  19849  228  19852 0

c  1-1 --> 0
c    (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0 ∧ -p_228) -> (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧ -b^{114, 3}_0)
c  in CNF:
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_2
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_1
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_0
c  in DIMACS:
 19847  19848 -19849  228 -19850 0
 19847  19848 -19849  228 -19851 0
 19847  19848 -19849  228 -19852 0

c  0-1 --> -1
c    (-b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧ -p_228) -> ( b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0)
c  in CNF:
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨  b^{114, 3}_2
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_1
c     b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨  b^{114, 3}_0
c  in DIMACS:
 19847  19848  19849  228  19850 0
 19847  19848  19849  228 -19851 0
 19847  19848  19849  228  19852 0

c  -1-1 --> -2
c    ( b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧  b^{114, 2}_0 ∧ -p_228) -> ( b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0)
c  in CNF:
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨  b^{114, 3}_2
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨  b^{114, 3}_1
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨  p_228 ∨ -b^{114, 3}_0
c  in DIMACS:
-19847  19848 -19849  228  19850 0
-19847  19848 -19849  228  19851 0
-19847  19848 -19849  228 -19852 0

c  -2-1 --> break 
c    ( b^{114, 2}_2 ∧  b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨  b^{114, 2}_0 ∨  p_228 ∨ break
c  in DIMACS:
-19847 -19848  19849  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 2}_2 ∧ -b^{114, 2}_1 ∧ -b^{114, 2}_0 ∧ true) 
c  in CNF:
c    -b^{114, 2}_2 ∨  b^{114, 2}_1 ∨  b^{114, 2}_0 ∨ false 
c  in DIMACS:
-19847  19848  19849  0

c  3 does not represent an automaton state.
c    -(-b^{114, 2}_2 ∧  b^{114, 2}_1 ∧  b^{114, 2}_0 ∧ true) 
c  in CNF:
c     b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ false 
c  in DIMACS:
 19847 -19848 -19849  0
c  -3 does not represent an automaton state.
c    -( b^{114, 2}_2 ∧  b^{114, 2}_1 ∧  b^{114, 2}_0 ∧ true) 
c  in CNF:
c    -b^{114, 2}_2 ∨ -b^{114, 2}_1 ∨ -b^{114, 2}_0 ∨ false 
c  in DIMACS:
-19847 -19848 -19849  0

c i = 3
c  -2+1 --> -1
c    ( b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧  p_342) -> ( b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0)
c  in CNF:
c    -b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨  b^{114, 4}_2
c    -b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_1
c    -b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨  b^{114, 4}_0
c  in DIMACS:
-19850 -19851  19852 -342  19853 0
-19850 -19851  19852 -342 -19854 0
-19850 -19851  19852 -342  19855 0

c  -1+1 --> 0
c    ( b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0 ∧  p_342) -> (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧ -b^{114, 4}_0)
c  in CNF:
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_2
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_1
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_0
c  in DIMACS:
-19850  19851 -19852 -342 -19853 0
-19850  19851 -19852 -342 -19854 0
-19850  19851 -19852 -342 -19855 0

c  0+1 --> 1
c    (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧  p_342) -> (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0)
c  in CNF:
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_2
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_1
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨  b^{114, 4}_0
c  in DIMACS:
 19850  19851  19852 -342 -19853 0
 19850  19851  19852 -342 -19854 0
 19850  19851  19852 -342  19855 0

c  1+1 --> 2
c    (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0 ∧  p_342) -> (-b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0)
c  in CNF:
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_2
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨  b^{114, 4}_1
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ -p_342 ∨ -b^{114, 4}_0
c  in DIMACS:
 19850  19851 -19852 -342 -19853 0
 19850  19851 -19852 -342  19854 0
 19850  19851 -19852 -342 -19855 0

c  2+1 --> break 
c    (-b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧  p_342) -> break
c  in CNF:
c     b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 19850 -19851  19852 -342 1162 0


c  2-1 --> 1
c    (-b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧ -p_342) -> (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0)
c  in CNF:
c     b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_2
c     b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_1
c     b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨  b^{114, 4}_0
c  in DIMACS:
 19850 -19851  19852  342 -19853 0
 19850 -19851  19852  342 -19854 0
 19850 -19851  19852  342  19855 0

c  1-1 --> 0
c    (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0 ∧ -p_342) -> (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧ -b^{114, 4}_0)
c  in CNF:
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_2
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_1
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_0
c  in DIMACS:
 19850  19851 -19852  342 -19853 0
 19850  19851 -19852  342 -19854 0
 19850  19851 -19852  342 -19855 0

c  0-1 --> -1
c    (-b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧ -p_342) -> ( b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0)
c  in CNF:
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨  b^{114, 4}_2
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_1
c     b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨  b^{114, 4}_0
c  in DIMACS:
 19850  19851  19852  342  19853 0
 19850  19851  19852  342 -19854 0
 19850  19851  19852  342  19855 0

c  -1-1 --> -2
c    ( b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧  b^{114, 3}_0 ∧ -p_342) -> ( b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0)
c  in CNF:
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨  b^{114, 4}_2
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨  b^{114, 4}_1
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨  p_342 ∨ -b^{114, 4}_0
c  in DIMACS:
-19850  19851 -19852  342  19853 0
-19850  19851 -19852  342  19854 0
-19850  19851 -19852  342 -19855 0

c  -2-1 --> break 
c    ( b^{114, 3}_2 ∧  b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨  b^{114, 3}_0 ∨  p_342 ∨ break
c  in DIMACS:
-19850 -19851  19852  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 3}_2 ∧ -b^{114, 3}_1 ∧ -b^{114, 3}_0 ∧ true) 
c  in CNF:
c    -b^{114, 3}_2 ∨  b^{114, 3}_1 ∨  b^{114, 3}_0 ∨ false 
c  in DIMACS:
-19850  19851  19852  0

c  3 does not represent an automaton state.
c    -(-b^{114, 3}_2 ∧  b^{114, 3}_1 ∧  b^{114, 3}_0 ∧ true) 
c  in CNF:
c     b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ false 
c  in DIMACS:
 19850 -19851 -19852  0
c  -3 does not represent an automaton state.
c    -( b^{114, 3}_2 ∧  b^{114, 3}_1 ∧  b^{114, 3}_0 ∧ true) 
c  in CNF:
c    -b^{114, 3}_2 ∨ -b^{114, 3}_1 ∨ -b^{114, 3}_0 ∨ false 
c  in DIMACS:
-19850 -19851 -19852  0

c i = 4
c  -2+1 --> -1
c    ( b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧  p_456) -> ( b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0)
c  in CNF:
c    -b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨  b^{114, 5}_2
c    -b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_1
c    -b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨  b^{114, 5}_0
c  in DIMACS:
-19853 -19854  19855 -456  19856 0
-19853 -19854  19855 -456 -19857 0
-19853 -19854  19855 -456  19858 0

c  -1+1 --> 0
c    ( b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0 ∧  p_456) -> (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧ -b^{114, 5}_0)
c  in CNF:
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_2
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_1
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_0
c  in DIMACS:
-19853  19854 -19855 -456 -19856 0
-19853  19854 -19855 -456 -19857 0
-19853  19854 -19855 -456 -19858 0

c  0+1 --> 1
c    (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧  p_456) -> (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0)
c  in CNF:
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_2
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_1
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨  b^{114, 5}_0
c  in DIMACS:
 19853  19854  19855 -456 -19856 0
 19853  19854  19855 -456 -19857 0
 19853  19854  19855 -456  19858 0

c  1+1 --> 2
c    (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0 ∧  p_456) -> (-b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0)
c  in CNF:
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_2
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨  b^{114, 5}_1
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ -p_456 ∨ -b^{114, 5}_0
c  in DIMACS:
 19853  19854 -19855 -456 -19856 0
 19853  19854 -19855 -456  19857 0
 19853  19854 -19855 -456 -19858 0

c  2+1 --> break 
c    (-b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧  p_456) -> break
c  in CNF:
c     b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 19853 -19854  19855 -456 1162 0


c  2-1 --> 1
c    (-b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧ -p_456) -> (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0)
c  in CNF:
c     b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_2
c     b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_1
c     b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨  b^{114, 5}_0
c  in DIMACS:
 19853 -19854  19855  456 -19856 0
 19853 -19854  19855  456 -19857 0
 19853 -19854  19855  456  19858 0

c  1-1 --> 0
c    (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0 ∧ -p_456) -> (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧ -b^{114, 5}_0)
c  in CNF:
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_2
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_1
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_0
c  in DIMACS:
 19853  19854 -19855  456 -19856 0
 19853  19854 -19855  456 -19857 0
 19853  19854 -19855  456 -19858 0

c  0-1 --> -1
c    (-b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧ -p_456) -> ( b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0)
c  in CNF:
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨  b^{114, 5}_2
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_1
c     b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨  b^{114, 5}_0
c  in DIMACS:
 19853  19854  19855  456  19856 0
 19853  19854  19855  456 -19857 0
 19853  19854  19855  456  19858 0

c  -1-1 --> -2
c    ( b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧  b^{114, 4}_0 ∧ -p_456) -> ( b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0)
c  in CNF:
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨  b^{114, 5}_2
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨  b^{114, 5}_1
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨  p_456 ∨ -b^{114, 5}_0
c  in DIMACS:
-19853  19854 -19855  456  19856 0
-19853  19854 -19855  456  19857 0
-19853  19854 -19855  456 -19858 0

c  -2-1 --> break 
c    ( b^{114, 4}_2 ∧  b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨  b^{114, 4}_0 ∨  p_456 ∨ break
c  in DIMACS:
-19853 -19854  19855  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 4}_2 ∧ -b^{114, 4}_1 ∧ -b^{114, 4}_0 ∧ true) 
c  in CNF:
c    -b^{114, 4}_2 ∨  b^{114, 4}_1 ∨  b^{114, 4}_0 ∨ false 
c  in DIMACS:
-19853  19854  19855  0

c  3 does not represent an automaton state.
c    -(-b^{114, 4}_2 ∧  b^{114, 4}_1 ∧  b^{114, 4}_0 ∧ true) 
c  in CNF:
c     b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ false 
c  in DIMACS:
 19853 -19854 -19855  0
c  -3 does not represent an automaton state.
c    -( b^{114, 4}_2 ∧  b^{114, 4}_1 ∧  b^{114, 4}_0 ∧ true) 
c  in CNF:
c    -b^{114, 4}_2 ∨ -b^{114, 4}_1 ∨ -b^{114, 4}_0 ∨ false 
c  in DIMACS:
-19853 -19854 -19855  0

c i = 5
c  -2+1 --> -1
c    ( b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧  p_570) -> ( b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0)
c  in CNF:
c    -b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨  b^{114, 6}_2
c    -b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_1
c    -b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨  b^{114, 6}_0
c  in DIMACS:
-19856 -19857  19858 -570  19859 0
-19856 -19857  19858 -570 -19860 0
-19856 -19857  19858 -570  19861 0

c  -1+1 --> 0
c    ( b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0 ∧  p_570) -> (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧ -b^{114, 6}_0)
c  in CNF:
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_2
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_1
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_0
c  in DIMACS:
-19856  19857 -19858 -570 -19859 0
-19856  19857 -19858 -570 -19860 0
-19856  19857 -19858 -570 -19861 0

c  0+1 --> 1
c    (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧  p_570) -> (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0)
c  in CNF:
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_2
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_1
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨  b^{114, 6}_0
c  in DIMACS:
 19856  19857  19858 -570 -19859 0
 19856  19857  19858 -570 -19860 0
 19856  19857  19858 -570  19861 0

c  1+1 --> 2
c    (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0 ∧  p_570) -> (-b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0)
c  in CNF:
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_2
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨  b^{114, 6}_1
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ -p_570 ∨ -b^{114, 6}_0
c  in DIMACS:
 19856  19857 -19858 -570 -19859 0
 19856  19857 -19858 -570  19860 0
 19856  19857 -19858 -570 -19861 0

c  2+1 --> break 
c    (-b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧  p_570) -> break
c  in CNF:
c     b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 19856 -19857  19858 -570 1162 0


c  2-1 --> 1
c    (-b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧ -p_570) -> (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0)
c  in CNF:
c     b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_2
c     b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_1
c     b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨  b^{114, 6}_0
c  in DIMACS:
 19856 -19857  19858  570 -19859 0
 19856 -19857  19858  570 -19860 0
 19856 -19857  19858  570  19861 0

c  1-1 --> 0
c    (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0 ∧ -p_570) -> (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧ -b^{114, 6}_0)
c  in CNF:
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_2
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_1
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_0
c  in DIMACS:
 19856  19857 -19858  570 -19859 0
 19856  19857 -19858  570 -19860 0
 19856  19857 -19858  570 -19861 0

c  0-1 --> -1
c    (-b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧ -p_570) -> ( b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0)
c  in CNF:
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨  b^{114, 6}_2
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_1
c     b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨  b^{114, 6}_0
c  in DIMACS:
 19856  19857  19858  570  19859 0
 19856  19857  19858  570 -19860 0
 19856  19857  19858  570  19861 0

c  -1-1 --> -2
c    ( b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧  b^{114, 5}_0 ∧ -p_570) -> ( b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0)
c  in CNF:
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨  b^{114, 6}_2
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨  b^{114, 6}_1
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨  p_570 ∨ -b^{114, 6}_0
c  in DIMACS:
-19856  19857 -19858  570  19859 0
-19856  19857 -19858  570  19860 0
-19856  19857 -19858  570 -19861 0

c  -2-1 --> break 
c    ( b^{114, 5}_2 ∧  b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨  b^{114, 5}_0 ∨  p_570 ∨ break
c  in DIMACS:
-19856 -19857  19858  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 5}_2 ∧ -b^{114, 5}_1 ∧ -b^{114, 5}_0 ∧ true) 
c  in CNF:
c    -b^{114, 5}_2 ∨  b^{114, 5}_1 ∨  b^{114, 5}_0 ∨ false 
c  in DIMACS:
-19856  19857  19858  0

c  3 does not represent an automaton state.
c    -(-b^{114, 5}_2 ∧  b^{114, 5}_1 ∧  b^{114, 5}_0 ∧ true) 
c  in CNF:
c     b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ false 
c  in DIMACS:
 19856 -19857 -19858  0
c  -3 does not represent an automaton state.
c    -( b^{114, 5}_2 ∧  b^{114, 5}_1 ∧  b^{114, 5}_0 ∧ true) 
c  in CNF:
c    -b^{114, 5}_2 ∨ -b^{114, 5}_1 ∨ -b^{114, 5}_0 ∨ false 
c  in DIMACS:
-19856 -19857 -19858  0

c i = 6
c  -2+1 --> -1
c    ( b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧  p_684) -> ( b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0)
c  in CNF:
c    -b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨  b^{114, 7}_2
c    -b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_1
c    -b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨  b^{114, 7}_0
c  in DIMACS:
-19859 -19860  19861 -684  19862 0
-19859 -19860  19861 -684 -19863 0
-19859 -19860  19861 -684  19864 0

c  -1+1 --> 0
c    ( b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0 ∧  p_684) -> (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧ -b^{114, 7}_0)
c  in CNF:
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_2
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_1
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_0
c  in DIMACS:
-19859  19860 -19861 -684 -19862 0
-19859  19860 -19861 -684 -19863 0
-19859  19860 -19861 -684 -19864 0

c  0+1 --> 1
c    (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧  p_684) -> (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0)
c  in CNF:
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_2
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_1
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨  b^{114, 7}_0
c  in DIMACS:
 19859  19860  19861 -684 -19862 0
 19859  19860  19861 -684 -19863 0
 19859  19860  19861 -684  19864 0

c  1+1 --> 2
c    (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0 ∧  p_684) -> (-b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0)
c  in CNF:
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_2
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨  b^{114, 7}_1
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ -p_684 ∨ -b^{114, 7}_0
c  in DIMACS:
 19859  19860 -19861 -684 -19862 0
 19859  19860 -19861 -684  19863 0
 19859  19860 -19861 -684 -19864 0

c  2+1 --> break 
c    (-b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧  p_684) -> break
c  in CNF:
c     b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 19859 -19860  19861 -684 1162 0


c  2-1 --> 1
c    (-b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧ -p_684) -> (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0)
c  in CNF:
c     b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_2
c     b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_1
c     b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨  b^{114, 7}_0
c  in DIMACS:
 19859 -19860  19861  684 -19862 0
 19859 -19860  19861  684 -19863 0
 19859 -19860  19861  684  19864 0

c  1-1 --> 0
c    (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0 ∧ -p_684) -> (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧ -b^{114, 7}_0)
c  in CNF:
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_2
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_1
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_0
c  in DIMACS:
 19859  19860 -19861  684 -19862 0
 19859  19860 -19861  684 -19863 0
 19859  19860 -19861  684 -19864 0

c  0-1 --> -1
c    (-b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧ -p_684) -> ( b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0)
c  in CNF:
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨  b^{114, 7}_2
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_1
c     b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨  b^{114, 7}_0
c  in DIMACS:
 19859  19860  19861  684  19862 0
 19859  19860  19861  684 -19863 0
 19859  19860  19861  684  19864 0

c  -1-1 --> -2
c    ( b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧  b^{114, 6}_0 ∧ -p_684) -> ( b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0)
c  in CNF:
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨  b^{114, 7}_2
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨  b^{114, 7}_1
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨  p_684 ∨ -b^{114, 7}_0
c  in DIMACS:
-19859  19860 -19861  684  19862 0
-19859  19860 -19861  684  19863 0
-19859  19860 -19861  684 -19864 0

c  -2-1 --> break 
c    ( b^{114, 6}_2 ∧  b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨  b^{114, 6}_0 ∨  p_684 ∨ break
c  in DIMACS:
-19859 -19860  19861  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 6}_2 ∧ -b^{114, 6}_1 ∧ -b^{114, 6}_0 ∧ true) 
c  in CNF:
c    -b^{114, 6}_2 ∨  b^{114, 6}_1 ∨  b^{114, 6}_0 ∨ false 
c  in DIMACS:
-19859  19860  19861  0

c  3 does not represent an automaton state.
c    -(-b^{114, 6}_2 ∧  b^{114, 6}_1 ∧  b^{114, 6}_0 ∧ true) 
c  in CNF:
c     b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ false 
c  in DIMACS:
 19859 -19860 -19861  0
c  -3 does not represent an automaton state.
c    -( b^{114, 6}_2 ∧  b^{114, 6}_1 ∧  b^{114, 6}_0 ∧ true) 
c  in CNF:
c    -b^{114, 6}_2 ∨ -b^{114, 6}_1 ∨ -b^{114, 6}_0 ∨ false 
c  in DIMACS:
-19859 -19860 -19861  0

c i = 7
c  -2+1 --> -1
c    ( b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧  p_798) -> ( b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0)
c  in CNF:
c    -b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨  b^{114, 8}_2
c    -b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_1
c    -b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨  b^{114, 8}_0
c  in DIMACS:
-19862 -19863  19864 -798  19865 0
-19862 -19863  19864 -798 -19866 0
-19862 -19863  19864 -798  19867 0

c  -1+1 --> 0
c    ( b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0 ∧  p_798) -> (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧ -b^{114, 8}_0)
c  in CNF:
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_2
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_1
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_0
c  in DIMACS:
-19862  19863 -19864 -798 -19865 0
-19862  19863 -19864 -798 -19866 0
-19862  19863 -19864 -798 -19867 0

c  0+1 --> 1
c    (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧  p_798) -> (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0)
c  in CNF:
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_2
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_1
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨  b^{114, 8}_0
c  in DIMACS:
 19862  19863  19864 -798 -19865 0
 19862  19863  19864 -798 -19866 0
 19862  19863  19864 -798  19867 0

c  1+1 --> 2
c    (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0 ∧  p_798) -> (-b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0)
c  in CNF:
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_2
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨  b^{114, 8}_1
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ -p_798 ∨ -b^{114, 8}_0
c  in DIMACS:
 19862  19863 -19864 -798 -19865 0
 19862  19863 -19864 -798  19866 0
 19862  19863 -19864 -798 -19867 0

c  2+1 --> break 
c    (-b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧  p_798) -> break
c  in CNF:
c     b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 19862 -19863  19864 -798 1162 0


c  2-1 --> 1
c    (-b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧ -p_798) -> (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0)
c  in CNF:
c     b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_2
c     b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_1
c     b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨  b^{114, 8}_0
c  in DIMACS:
 19862 -19863  19864  798 -19865 0
 19862 -19863  19864  798 -19866 0
 19862 -19863  19864  798  19867 0

c  1-1 --> 0
c    (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0 ∧ -p_798) -> (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧ -b^{114, 8}_0)
c  in CNF:
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_2
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_1
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_0
c  in DIMACS:
 19862  19863 -19864  798 -19865 0
 19862  19863 -19864  798 -19866 0
 19862  19863 -19864  798 -19867 0

c  0-1 --> -1
c    (-b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧ -p_798) -> ( b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0)
c  in CNF:
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨  b^{114, 8}_2
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_1
c     b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨  b^{114, 8}_0
c  in DIMACS:
 19862  19863  19864  798  19865 0
 19862  19863  19864  798 -19866 0
 19862  19863  19864  798  19867 0

c  -1-1 --> -2
c    ( b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧  b^{114, 7}_0 ∧ -p_798) -> ( b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0)
c  in CNF:
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨  b^{114, 8}_2
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨  b^{114, 8}_1
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨  p_798 ∨ -b^{114, 8}_0
c  in DIMACS:
-19862  19863 -19864  798  19865 0
-19862  19863 -19864  798  19866 0
-19862  19863 -19864  798 -19867 0

c  -2-1 --> break 
c    ( b^{114, 7}_2 ∧  b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨  b^{114, 7}_0 ∨  p_798 ∨ break
c  in DIMACS:
-19862 -19863  19864  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 7}_2 ∧ -b^{114, 7}_1 ∧ -b^{114, 7}_0 ∧ true) 
c  in CNF:
c    -b^{114, 7}_2 ∨  b^{114, 7}_1 ∨  b^{114, 7}_0 ∨ false 
c  in DIMACS:
-19862  19863  19864  0

c  3 does not represent an automaton state.
c    -(-b^{114, 7}_2 ∧  b^{114, 7}_1 ∧  b^{114, 7}_0 ∧ true) 
c  in CNF:
c     b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ false 
c  in DIMACS:
 19862 -19863 -19864  0
c  -3 does not represent an automaton state.
c    -( b^{114, 7}_2 ∧  b^{114, 7}_1 ∧  b^{114, 7}_0 ∧ true) 
c  in CNF:
c    -b^{114, 7}_2 ∨ -b^{114, 7}_1 ∨ -b^{114, 7}_0 ∨ false 
c  in DIMACS:
-19862 -19863 -19864  0

c i = 8
c  -2+1 --> -1
c    ( b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧  p_912) -> ( b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0)
c  in CNF:
c    -b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨  b^{114, 9}_2
c    -b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_1
c    -b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨  b^{114, 9}_0
c  in DIMACS:
-19865 -19866  19867 -912  19868 0
-19865 -19866  19867 -912 -19869 0
-19865 -19866  19867 -912  19870 0

c  -1+1 --> 0
c    ( b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0 ∧  p_912) -> (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧ -b^{114, 9}_0)
c  in CNF:
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_2
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_1
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_0
c  in DIMACS:
-19865  19866 -19867 -912 -19868 0
-19865  19866 -19867 -912 -19869 0
-19865  19866 -19867 -912 -19870 0

c  0+1 --> 1
c    (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧  p_912) -> (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0)
c  in CNF:
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_2
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_1
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨  b^{114, 9}_0
c  in DIMACS:
 19865  19866  19867 -912 -19868 0
 19865  19866  19867 -912 -19869 0
 19865  19866  19867 -912  19870 0

c  1+1 --> 2
c    (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0 ∧  p_912) -> (-b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0)
c  in CNF:
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_2
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨  b^{114, 9}_1
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ -p_912 ∨ -b^{114, 9}_0
c  in DIMACS:
 19865  19866 -19867 -912 -19868 0
 19865  19866 -19867 -912  19869 0
 19865  19866 -19867 -912 -19870 0

c  2+1 --> break 
c    (-b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧  p_912) -> break
c  in CNF:
c     b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 19865 -19866  19867 -912 1162 0


c  2-1 --> 1
c    (-b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧ -p_912) -> (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0)
c  in CNF:
c     b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_2
c     b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_1
c     b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨  b^{114, 9}_0
c  in DIMACS:
 19865 -19866  19867  912 -19868 0
 19865 -19866  19867  912 -19869 0
 19865 -19866  19867  912  19870 0

c  1-1 --> 0
c    (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0 ∧ -p_912) -> (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧ -b^{114, 9}_0)
c  in CNF:
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_2
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_1
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_0
c  in DIMACS:
 19865  19866 -19867  912 -19868 0
 19865  19866 -19867  912 -19869 0
 19865  19866 -19867  912 -19870 0

c  0-1 --> -1
c    (-b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧ -p_912) -> ( b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0)
c  in CNF:
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨  b^{114, 9}_2
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_1
c     b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨  b^{114, 9}_0
c  in DIMACS:
 19865  19866  19867  912  19868 0
 19865  19866  19867  912 -19869 0
 19865  19866  19867  912  19870 0

c  -1-1 --> -2
c    ( b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧  b^{114, 8}_0 ∧ -p_912) -> ( b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0)
c  in CNF:
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨  b^{114, 9}_2
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨  b^{114, 9}_1
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨  p_912 ∨ -b^{114, 9}_0
c  in DIMACS:
-19865  19866 -19867  912  19868 0
-19865  19866 -19867  912  19869 0
-19865  19866 -19867  912 -19870 0

c  -2-1 --> break 
c    ( b^{114, 8}_2 ∧  b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨  b^{114, 8}_0 ∨  p_912 ∨ break
c  in DIMACS:
-19865 -19866  19867  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 8}_2 ∧ -b^{114, 8}_1 ∧ -b^{114, 8}_0 ∧ true) 
c  in CNF:
c    -b^{114, 8}_2 ∨  b^{114, 8}_1 ∨  b^{114, 8}_0 ∨ false 
c  in DIMACS:
-19865  19866  19867  0

c  3 does not represent an automaton state.
c    -(-b^{114, 8}_2 ∧  b^{114, 8}_1 ∧  b^{114, 8}_0 ∧ true) 
c  in CNF:
c     b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ false 
c  in DIMACS:
 19865 -19866 -19867  0
c  -3 does not represent an automaton state.
c    -( b^{114, 8}_2 ∧  b^{114, 8}_1 ∧  b^{114, 8}_0 ∧ true) 
c  in CNF:
c    -b^{114, 8}_2 ∨ -b^{114, 8}_1 ∨ -b^{114, 8}_0 ∨ false 
c  in DIMACS:
-19865 -19866 -19867  0

c i = 9
c  -2+1 --> -1
c    ( b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧  p_1026) -> ( b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0)
c  in CNF:
c    -b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨  b^{114, 10}_2
c    -b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_1
c    -b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨  b^{114, 10}_0
c  in DIMACS:
-19868 -19869  19870 -1026  19871 0
-19868 -19869  19870 -1026 -19872 0
-19868 -19869  19870 -1026  19873 0

c  -1+1 --> 0
c    ( b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0 ∧  p_1026) -> (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧ -b^{114, 10}_0)
c  in CNF:
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_2
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_1
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_0
c  in DIMACS:
-19868  19869 -19870 -1026 -19871 0
-19868  19869 -19870 -1026 -19872 0
-19868  19869 -19870 -1026 -19873 0

c  0+1 --> 1
c    (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧  p_1026) -> (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0)
c  in CNF:
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_2
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_1
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨  b^{114, 10}_0
c  in DIMACS:
 19868  19869  19870 -1026 -19871 0
 19868  19869  19870 -1026 -19872 0
 19868  19869  19870 -1026  19873 0

c  1+1 --> 2
c    (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0 ∧  p_1026) -> (-b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0)
c  in CNF:
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_2
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨  b^{114, 10}_1
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ -p_1026 ∨ -b^{114, 10}_0
c  in DIMACS:
 19868  19869 -19870 -1026 -19871 0
 19868  19869 -19870 -1026  19872 0
 19868  19869 -19870 -1026 -19873 0

c  2+1 --> break 
c    (-b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 19868 -19869  19870 -1026 1162 0


c  2-1 --> 1
c    (-b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧ -p_1026) -> (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0)
c  in CNF:
c     b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_2
c     b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_1
c     b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨  b^{114, 10}_0
c  in DIMACS:
 19868 -19869  19870  1026 -19871 0
 19868 -19869  19870  1026 -19872 0
 19868 -19869  19870  1026  19873 0

c  1-1 --> 0
c    (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0 ∧ -p_1026) -> (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧ -b^{114, 10}_0)
c  in CNF:
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_2
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_1
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_0
c  in DIMACS:
 19868  19869 -19870  1026 -19871 0
 19868  19869 -19870  1026 -19872 0
 19868  19869 -19870  1026 -19873 0

c  0-1 --> -1
c    (-b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧ -p_1026) -> ( b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0)
c  in CNF:
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨  b^{114, 10}_2
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_1
c     b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨  b^{114, 10}_0
c  in DIMACS:
 19868  19869  19870  1026  19871 0
 19868  19869  19870  1026 -19872 0
 19868  19869  19870  1026  19873 0

c  -1-1 --> -2
c    ( b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧  b^{114, 9}_0 ∧ -p_1026) -> ( b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0)
c  in CNF:
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨  b^{114, 10}_2
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨  b^{114, 10}_1
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨  p_1026 ∨ -b^{114, 10}_0
c  in DIMACS:
-19868  19869 -19870  1026  19871 0
-19868  19869 -19870  1026  19872 0
-19868  19869 -19870  1026 -19873 0

c  -2-1 --> break 
c    ( b^{114, 9}_2 ∧  b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨  b^{114, 9}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-19868 -19869  19870  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 9}_2 ∧ -b^{114, 9}_1 ∧ -b^{114, 9}_0 ∧ true) 
c  in CNF:
c    -b^{114, 9}_2 ∨  b^{114, 9}_1 ∨  b^{114, 9}_0 ∨ false 
c  in DIMACS:
-19868  19869  19870  0

c  3 does not represent an automaton state.
c    -(-b^{114, 9}_2 ∧  b^{114, 9}_1 ∧  b^{114, 9}_0 ∧ true) 
c  in CNF:
c     b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ false 
c  in DIMACS:
 19868 -19869 -19870  0
c  -3 does not represent an automaton state.
c    -( b^{114, 9}_2 ∧  b^{114, 9}_1 ∧  b^{114, 9}_0 ∧ true) 
c  in CNF:
c    -b^{114, 9}_2 ∨ -b^{114, 9}_1 ∨ -b^{114, 9}_0 ∨ false 
c  in DIMACS:
-19868 -19869 -19870  0

c i = 10
c  -2+1 --> -1
c    ( b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧  p_1140) -> ( b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧  b^{114, 11}_0)
c  in CNF:
c    -b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨  b^{114, 11}_2
c    -b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_1
c    -b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨  b^{114, 11}_0
c  in DIMACS:
-19871 -19872  19873 -1140  19874 0
-19871 -19872  19873 -1140 -19875 0
-19871 -19872  19873 -1140  19876 0

c  -1+1 --> 0
c    ( b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0 ∧  p_1140) -> (-b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧ -b^{114, 11}_0)
c  in CNF:
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_2
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_1
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_0
c  in DIMACS:
-19871  19872 -19873 -1140 -19874 0
-19871  19872 -19873 -1140 -19875 0
-19871  19872 -19873 -1140 -19876 0

c  0+1 --> 1
c    (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧  p_1140) -> (-b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧  b^{114, 11}_0)
c  in CNF:
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_2
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_1
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨  b^{114, 11}_0
c  in DIMACS:
 19871  19872  19873 -1140 -19874 0
 19871  19872  19873 -1140 -19875 0
 19871  19872  19873 -1140  19876 0

c  1+1 --> 2
c    (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0 ∧  p_1140) -> (-b^{114, 11}_2 ∧  b^{114, 11}_1 ∧ -b^{114, 11}_0)
c  in CNF:
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_2
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨  b^{114, 11}_1
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ -p_1140 ∨ -b^{114, 11}_0
c  in DIMACS:
 19871  19872 -19873 -1140 -19874 0
 19871  19872 -19873 -1140  19875 0
 19871  19872 -19873 -1140 -19876 0

c  2+1 --> break 
c    (-b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 19871 -19872  19873 -1140 1162 0


c  2-1 --> 1
c    (-b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧ -p_1140) -> (-b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧  b^{114, 11}_0)
c  in CNF:
c     b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_2
c     b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_1
c     b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨  b^{114, 11}_0
c  in DIMACS:
 19871 -19872  19873  1140 -19874 0
 19871 -19872  19873  1140 -19875 0
 19871 -19872  19873  1140  19876 0

c  1-1 --> 0
c    (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0 ∧ -p_1140) -> (-b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧ -b^{114, 11}_0)
c  in CNF:
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_2
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_1
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_0
c  in DIMACS:
 19871  19872 -19873  1140 -19874 0
 19871  19872 -19873  1140 -19875 0
 19871  19872 -19873  1140 -19876 0

c  0-1 --> -1
c    (-b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧ -p_1140) -> ( b^{114, 11}_2 ∧ -b^{114, 11}_1 ∧  b^{114, 11}_0)
c  in CNF:
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨  b^{114, 11}_2
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_1
c     b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨  b^{114, 11}_0
c  in DIMACS:
 19871  19872  19873  1140  19874 0
 19871  19872  19873  1140 -19875 0
 19871  19872  19873  1140  19876 0

c  -1-1 --> -2
c    ( b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧  b^{114, 10}_0 ∧ -p_1140) -> ( b^{114, 11}_2 ∧  b^{114, 11}_1 ∧ -b^{114, 11}_0)
c  in CNF:
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨  b^{114, 11}_2
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨  b^{114, 11}_1
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨  p_1140 ∨ -b^{114, 11}_0
c  in DIMACS:
-19871  19872 -19873  1140  19874 0
-19871  19872 -19873  1140  19875 0
-19871  19872 -19873  1140 -19876 0

c  -2-1 --> break 
c    ( b^{114, 10}_2 ∧  b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨  b^{114, 10}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-19871 -19872  19873  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{114, 10}_2 ∧ -b^{114, 10}_1 ∧ -b^{114, 10}_0 ∧ true) 
c  in CNF:
c    -b^{114, 10}_2 ∨  b^{114, 10}_1 ∨  b^{114, 10}_0 ∨ false 
c  in DIMACS:
-19871  19872  19873  0

c  3 does not represent an automaton state.
c    -(-b^{114, 10}_2 ∧  b^{114, 10}_1 ∧  b^{114, 10}_0 ∧ true) 
c  in CNF:
c     b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ false 
c  in DIMACS:
 19871 -19872 -19873  0
c  -3 does not represent an automaton state.
c    -( b^{114, 10}_2 ∧  b^{114, 10}_1 ∧  b^{114, 10}_0 ∧ true) 
c  in CNF:
c    -b^{114, 10}_2 ∨ -b^{114, 10}_1 ∨ -b^{114, 10}_0 ∨ false 
c  in DIMACS:
-19871 -19872 -19873  0

c INIT for k = 115
c    -b^{115, 1}_2
c    -b^{115, 1}_1
c    -b^{115, 1}_0
c  in DIMACS:
-19877 0
-19878 0
-19879 0

c Transitions for k = 115
c i = 1
c  -2+1 --> -1
c    ( b^{115, 1}_2 ∧  b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧  p_115) -> ( b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0)
c  in CNF:
c    -b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨  b^{115, 2}_2
c    -b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_1
c    -b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨  b^{115, 2}_0
c  in DIMACS:
-19877 -19878  19879 -115  19880 0
-19877 -19878  19879 -115 -19881 0
-19877 -19878  19879 -115  19882 0

c  -1+1 --> 0
c    ( b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧  b^{115, 1}_0 ∧  p_115) -> (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧ -b^{115, 2}_0)
c  in CNF:
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_2
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_1
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_0
c  in DIMACS:
-19877  19878 -19879 -115 -19880 0
-19877  19878 -19879 -115 -19881 0
-19877  19878 -19879 -115 -19882 0

c  0+1 --> 1
c    (-b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧  p_115) -> (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0)
c  in CNF:
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_2
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_1
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨  b^{115, 2}_0
c  in DIMACS:
 19877  19878  19879 -115 -19880 0
 19877  19878  19879 -115 -19881 0
 19877  19878  19879 -115  19882 0

c  1+1 --> 2
c    (-b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧  b^{115, 1}_0 ∧  p_115) -> (-b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0)
c  in CNF:
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_2
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨  b^{115, 2}_1
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ -p_115 ∨ -b^{115, 2}_0
c  in DIMACS:
 19877  19878 -19879 -115 -19880 0
 19877  19878 -19879 -115  19881 0
 19877  19878 -19879 -115 -19882 0

c  2+1 --> break 
c    (-b^{115, 1}_2 ∧  b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧  p_115) -> break
c  in CNF:
c     b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ -p_115 ∨ break
c  in DIMACS:
 19877 -19878  19879 -115 1162 0


c  2-1 --> 1
c    (-b^{115, 1}_2 ∧  b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧ -p_115) -> (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0)
c  in CNF:
c     b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_2
c     b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_1
c     b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨  b^{115, 2}_0
c  in DIMACS:
 19877 -19878  19879  115 -19880 0
 19877 -19878  19879  115 -19881 0
 19877 -19878  19879  115  19882 0

c  1-1 --> 0
c    (-b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧  b^{115, 1}_0 ∧ -p_115) -> (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧ -b^{115, 2}_0)
c  in CNF:
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_2
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_1
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_0
c  in DIMACS:
 19877  19878 -19879  115 -19880 0
 19877  19878 -19879  115 -19881 0
 19877  19878 -19879  115 -19882 0

c  0-1 --> -1
c    (-b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧ -p_115) -> ( b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0)
c  in CNF:
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨  b^{115, 2}_2
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_1
c     b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨  b^{115, 2}_0
c  in DIMACS:
 19877  19878  19879  115  19880 0
 19877  19878  19879  115 -19881 0
 19877  19878  19879  115  19882 0

c  -1-1 --> -2
c    ( b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧  b^{115, 1}_0 ∧ -p_115) -> ( b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0)
c  in CNF:
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨  b^{115, 2}_2
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨  b^{115, 2}_1
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨  p_115 ∨ -b^{115, 2}_0
c  in DIMACS:
-19877  19878 -19879  115  19880 0
-19877  19878 -19879  115  19881 0
-19877  19878 -19879  115 -19882 0

c  -2-1 --> break 
c    ( b^{115, 1}_2 ∧  b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧ -p_115) -> break
c  in CNF:
c    -b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨  b^{115, 1}_0 ∨  p_115 ∨ break
c  in DIMACS:
-19877 -19878  19879  115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 1}_2 ∧ -b^{115, 1}_1 ∧ -b^{115, 1}_0 ∧ true) 
c  in CNF:
c    -b^{115, 1}_2 ∨  b^{115, 1}_1 ∨  b^{115, 1}_0 ∨ false 
c  in DIMACS:
-19877  19878  19879  0

c  3 does not represent an automaton state.
c    -(-b^{115, 1}_2 ∧  b^{115, 1}_1 ∧  b^{115, 1}_0 ∧ true) 
c  in CNF:
c     b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ false 
c  in DIMACS:
 19877 -19878 -19879  0
c  -3 does not represent an automaton state.
c    -( b^{115, 1}_2 ∧  b^{115, 1}_1 ∧  b^{115, 1}_0 ∧ true) 
c  in CNF:
c    -b^{115, 1}_2 ∨ -b^{115, 1}_1 ∨ -b^{115, 1}_0 ∨ false 
c  in DIMACS:
-19877 -19878 -19879  0

c i = 2
c  -2+1 --> -1
c    ( b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧  p_230) -> ( b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0)
c  in CNF:
c    -b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨  b^{115, 3}_2
c    -b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_1
c    -b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨  b^{115, 3}_0
c  in DIMACS:
-19880 -19881  19882 -230  19883 0
-19880 -19881  19882 -230 -19884 0
-19880 -19881  19882 -230  19885 0

c  -1+1 --> 0
c    ( b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0 ∧  p_230) -> (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧ -b^{115, 3}_0)
c  in CNF:
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_2
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_1
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_0
c  in DIMACS:
-19880  19881 -19882 -230 -19883 0
-19880  19881 -19882 -230 -19884 0
-19880  19881 -19882 -230 -19885 0

c  0+1 --> 1
c    (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧  p_230) -> (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0)
c  in CNF:
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_2
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_1
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨  b^{115, 3}_0
c  in DIMACS:
 19880  19881  19882 -230 -19883 0
 19880  19881  19882 -230 -19884 0
 19880  19881  19882 -230  19885 0

c  1+1 --> 2
c    (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0 ∧  p_230) -> (-b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0)
c  in CNF:
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_2
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨  b^{115, 3}_1
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ -p_230 ∨ -b^{115, 3}_0
c  in DIMACS:
 19880  19881 -19882 -230 -19883 0
 19880  19881 -19882 -230  19884 0
 19880  19881 -19882 -230 -19885 0

c  2+1 --> break 
c    (-b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧  p_230) -> break
c  in CNF:
c     b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 19880 -19881  19882 -230 1162 0


c  2-1 --> 1
c    (-b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧ -p_230) -> (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0)
c  in CNF:
c     b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_2
c     b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_1
c     b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨  b^{115, 3}_0
c  in DIMACS:
 19880 -19881  19882  230 -19883 0
 19880 -19881  19882  230 -19884 0
 19880 -19881  19882  230  19885 0

c  1-1 --> 0
c    (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0 ∧ -p_230) -> (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧ -b^{115, 3}_0)
c  in CNF:
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_2
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_1
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_0
c  in DIMACS:
 19880  19881 -19882  230 -19883 0
 19880  19881 -19882  230 -19884 0
 19880  19881 -19882  230 -19885 0

c  0-1 --> -1
c    (-b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧ -p_230) -> ( b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0)
c  in CNF:
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨  b^{115, 3}_2
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_1
c     b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨  b^{115, 3}_0
c  in DIMACS:
 19880  19881  19882  230  19883 0
 19880  19881  19882  230 -19884 0
 19880  19881  19882  230  19885 0

c  -1-1 --> -2
c    ( b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧  b^{115, 2}_0 ∧ -p_230) -> ( b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0)
c  in CNF:
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨  b^{115, 3}_2
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨  b^{115, 3}_1
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨  p_230 ∨ -b^{115, 3}_0
c  in DIMACS:
-19880  19881 -19882  230  19883 0
-19880  19881 -19882  230  19884 0
-19880  19881 -19882  230 -19885 0

c  -2-1 --> break 
c    ( b^{115, 2}_2 ∧  b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨  b^{115, 2}_0 ∨  p_230 ∨ break
c  in DIMACS:
-19880 -19881  19882  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 2}_2 ∧ -b^{115, 2}_1 ∧ -b^{115, 2}_0 ∧ true) 
c  in CNF:
c    -b^{115, 2}_2 ∨  b^{115, 2}_1 ∨  b^{115, 2}_0 ∨ false 
c  in DIMACS:
-19880  19881  19882  0

c  3 does not represent an automaton state.
c    -(-b^{115, 2}_2 ∧  b^{115, 2}_1 ∧  b^{115, 2}_0 ∧ true) 
c  in CNF:
c     b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ false 
c  in DIMACS:
 19880 -19881 -19882  0
c  -3 does not represent an automaton state.
c    -( b^{115, 2}_2 ∧  b^{115, 2}_1 ∧  b^{115, 2}_0 ∧ true) 
c  in CNF:
c    -b^{115, 2}_2 ∨ -b^{115, 2}_1 ∨ -b^{115, 2}_0 ∨ false 
c  in DIMACS:
-19880 -19881 -19882  0

c i = 3
c  -2+1 --> -1
c    ( b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧  p_345) -> ( b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0)
c  in CNF:
c    -b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨  b^{115, 4}_2
c    -b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_1
c    -b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨  b^{115, 4}_0
c  in DIMACS:
-19883 -19884  19885 -345  19886 0
-19883 -19884  19885 -345 -19887 0
-19883 -19884  19885 -345  19888 0

c  -1+1 --> 0
c    ( b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0 ∧  p_345) -> (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧ -b^{115, 4}_0)
c  in CNF:
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_2
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_1
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_0
c  in DIMACS:
-19883  19884 -19885 -345 -19886 0
-19883  19884 -19885 -345 -19887 0
-19883  19884 -19885 -345 -19888 0

c  0+1 --> 1
c    (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧  p_345) -> (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0)
c  in CNF:
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_2
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_1
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨  b^{115, 4}_0
c  in DIMACS:
 19883  19884  19885 -345 -19886 0
 19883  19884  19885 -345 -19887 0
 19883  19884  19885 -345  19888 0

c  1+1 --> 2
c    (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0 ∧  p_345) -> (-b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0)
c  in CNF:
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_2
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨  b^{115, 4}_1
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ -p_345 ∨ -b^{115, 4}_0
c  in DIMACS:
 19883  19884 -19885 -345 -19886 0
 19883  19884 -19885 -345  19887 0
 19883  19884 -19885 -345 -19888 0

c  2+1 --> break 
c    (-b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧  p_345) -> break
c  in CNF:
c     b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 19883 -19884  19885 -345 1162 0


c  2-1 --> 1
c    (-b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧ -p_345) -> (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0)
c  in CNF:
c     b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_2
c     b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_1
c     b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨  b^{115, 4}_0
c  in DIMACS:
 19883 -19884  19885  345 -19886 0
 19883 -19884  19885  345 -19887 0
 19883 -19884  19885  345  19888 0

c  1-1 --> 0
c    (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0 ∧ -p_345) -> (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧ -b^{115, 4}_0)
c  in CNF:
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_2
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_1
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_0
c  in DIMACS:
 19883  19884 -19885  345 -19886 0
 19883  19884 -19885  345 -19887 0
 19883  19884 -19885  345 -19888 0

c  0-1 --> -1
c    (-b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧ -p_345) -> ( b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0)
c  in CNF:
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨  b^{115, 4}_2
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_1
c     b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨  b^{115, 4}_0
c  in DIMACS:
 19883  19884  19885  345  19886 0
 19883  19884  19885  345 -19887 0
 19883  19884  19885  345  19888 0

c  -1-1 --> -2
c    ( b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧  b^{115, 3}_0 ∧ -p_345) -> ( b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0)
c  in CNF:
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨  b^{115, 4}_2
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨  b^{115, 4}_1
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨  p_345 ∨ -b^{115, 4}_0
c  in DIMACS:
-19883  19884 -19885  345  19886 0
-19883  19884 -19885  345  19887 0
-19883  19884 -19885  345 -19888 0

c  -2-1 --> break 
c    ( b^{115, 3}_2 ∧  b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨  b^{115, 3}_0 ∨  p_345 ∨ break
c  in DIMACS:
-19883 -19884  19885  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 3}_2 ∧ -b^{115, 3}_1 ∧ -b^{115, 3}_0 ∧ true) 
c  in CNF:
c    -b^{115, 3}_2 ∨  b^{115, 3}_1 ∨  b^{115, 3}_0 ∨ false 
c  in DIMACS:
-19883  19884  19885  0

c  3 does not represent an automaton state.
c    -(-b^{115, 3}_2 ∧  b^{115, 3}_1 ∧  b^{115, 3}_0 ∧ true) 
c  in CNF:
c     b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ false 
c  in DIMACS:
 19883 -19884 -19885  0
c  -3 does not represent an automaton state.
c    -( b^{115, 3}_2 ∧  b^{115, 3}_1 ∧  b^{115, 3}_0 ∧ true) 
c  in CNF:
c    -b^{115, 3}_2 ∨ -b^{115, 3}_1 ∨ -b^{115, 3}_0 ∨ false 
c  in DIMACS:
-19883 -19884 -19885  0

c i = 4
c  -2+1 --> -1
c    ( b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧  p_460) -> ( b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0)
c  in CNF:
c    -b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨  b^{115, 5}_2
c    -b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_1
c    -b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨  b^{115, 5}_0
c  in DIMACS:
-19886 -19887  19888 -460  19889 0
-19886 -19887  19888 -460 -19890 0
-19886 -19887  19888 -460  19891 0

c  -1+1 --> 0
c    ( b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0 ∧  p_460) -> (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧ -b^{115, 5}_0)
c  in CNF:
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_2
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_1
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_0
c  in DIMACS:
-19886  19887 -19888 -460 -19889 0
-19886  19887 -19888 -460 -19890 0
-19886  19887 -19888 -460 -19891 0

c  0+1 --> 1
c    (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧  p_460) -> (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0)
c  in CNF:
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_2
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_1
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨  b^{115, 5}_0
c  in DIMACS:
 19886  19887  19888 -460 -19889 0
 19886  19887  19888 -460 -19890 0
 19886  19887  19888 -460  19891 0

c  1+1 --> 2
c    (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0 ∧  p_460) -> (-b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0)
c  in CNF:
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_2
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨  b^{115, 5}_1
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ -p_460 ∨ -b^{115, 5}_0
c  in DIMACS:
 19886  19887 -19888 -460 -19889 0
 19886  19887 -19888 -460  19890 0
 19886  19887 -19888 -460 -19891 0

c  2+1 --> break 
c    (-b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧  p_460) -> break
c  in CNF:
c     b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 19886 -19887  19888 -460 1162 0


c  2-1 --> 1
c    (-b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧ -p_460) -> (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0)
c  in CNF:
c     b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_2
c     b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_1
c     b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨  b^{115, 5}_0
c  in DIMACS:
 19886 -19887  19888  460 -19889 0
 19886 -19887  19888  460 -19890 0
 19886 -19887  19888  460  19891 0

c  1-1 --> 0
c    (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0 ∧ -p_460) -> (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧ -b^{115, 5}_0)
c  in CNF:
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_2
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_1
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_0
c  in DIMACS:
 19886  19887 -19888  460 -19889 0
 19886  19887 -19888  460 -19890 0
 19886  19887 -19888  460 -19891 0

c  0-1 --> -1
c    (-b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧ -p_460) -> ( b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0)
c  in CNF:
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨  b^{115, 5}_2
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_1
c     b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨  b^{115, 5}_0
c  in DIMACS:
 19886  19887  19888  460  19889 0
 19886  19887  19888  460 -19890 0
 19886  19887  19888  460  19891 0

c  -1-1 --> -2
c    ( b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧  b^{115, 4}_0 ∧ -p_460) -> ( b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0)
c  in CNF:
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨  b^{115, 5}_2
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨  b^{115, 5}_1
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨  p_460 ∨ -b^{115, 5}_0
c  in DIMACS:
-19886  19887 -19888  460  19889 0
-19886  19887 -19888  460  19890 0
-19886  19887 -19888  460 -19891 0

c  -2-1 --> break 
c    ( b^{115, 4}_2 ∧  b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨  b^{115, 4}_0 ∨  p_460 ∨ break
c  in DIMACS:
-19886 -19887  19888  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 4}_2 ∧ -b^{115, 4}_1 ∧ -b^{115, 4}_0 ∧ true) 
c  in CNF:
c    -b^{115, 4}_2 ∨  b^{115, 4}_1 ∨  b^{115, 4}_0 ∨ false 
c  in DIMACS:
-19886  19887  19888  0

c  3 does not represent an automaton state.
c    -(-b^{115, 4}_2 ∧  b^{115, 4}_1 ∧  b^{115, 4}_0 ∧ true) 
c  in CNF:
c     b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ false 
c  in DIMACS:
 19886 -19887 -19888  0
c  -3 does not represent an automaton state.
c    -( b^{115, 4}_2 ∧  b^{115, 4}_1 ∧  b^{115, 4}_0 ∧ true) 
c  in CNF:
c    -b^{115, 4}_2 ∨ -b^{115, 4}_1 ∨ -b^{115, 4}_0 ∨ false 
c  in DIMACS:
-19886 -19887 -19888  0

c i = 5
c  -2+1 --> -1
c    ( b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧  p_575) -> ( b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0)
c  in CNF:
c    -b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨  b^{115, 6}_2
c    -b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_1
c    -b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨  b^{115, 6}_0
c  in DIMACS:
-19889 -19890  19891 -575  19892 0
-19889 -19890  19891 -575 -19893 0
-19889 -19890  19891 -575  19894 0

c  -1+1 --> 0
c    ( b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0 ∧  p_575) -> (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧ -b^{115, 6}_0)
c  in CNF:
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_2
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_1
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_0
c  in DIMACS:
-19889  19890 -19891 -575 -19892 0
-19889  19890 -19891 -575 -19893 0
-19889  19890 -19891 -575 -19894 0

c  0+1 --> 1
c    (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧  p_575) -> (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0)
c  in CNF:
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_2
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_1
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨  b^{115, 6}_0
c  in DIMACS:
 19889  19890  19891 -575 -19892 0
 19889  19890  19891 -575 -19893 0
 19889  19890  19891 -575  19894 0

c  1+1 --> 2
c    (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0 ∧  p_575) -> (-b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0)
c  in CNF:
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_2
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨  b^{115, 6}_1
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ -p_575 ∨ -b^{115, 6}_0
c  in DIMACS:
 19889  19890 -19891 -575 -19892 0
 19889  19890 -19891 -575  19893 0
 19889  19890 -19891 -575 -19894 0

c  2+1 --> break 
c    (-b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧  p_575) -> break
c  in CNF:
c     b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ -p_575 ∨ break
c  in DIMACS:
 19889 -19890  19891 -575 1162 0


c  2-1 --> 1
c    (-b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧ -p_575) -> (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0)
c  in CNF:
c     b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_2
c     b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_1
c     b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨  b^{115, 6}_0
c  in DIMACS:
 19889 -19890  19891  575 -19892 0
 19889 -19890  19891  575 -19893 0
 19889 -19890  19891  575  19894 0

c  1-1 --> 0
c    (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0 ∧ -p_575) -> (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧ -b^{115, 6}_0)
c  in CNF:
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_2
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_1
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_0
c  in DIMACS:
 19889  19890 -19891  575 -19892 0
 19889  19890 -19891  575 -19893 0
 19889  19890 -19891  575 -19894 0

c  0-1 --> -1
c    (-b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧ -p_575) -> ( b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0)
c  in CNF:
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨  b^{115, 6}_2
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_1
c     b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨  b^{115, 6}_0
c  in DIMACS:
 19889  19890  19891  575  19892 0
 19889  19890  19891  575 -19893 0
 19889  19890  19891  575  19894 0

c  -1-1 --> -2
c    ( b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧  b^{115, 5}_0 ∧ -p_575) -> ( b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0)
c  in CNF:
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨  b^{115, 6}_2
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨  b^{115, 6}_1
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨  p_575 ∨ -b^{115, 6}_0
c  in DIMACS:
-19889  19890 -19891  575  19892 0
-19889  19890 -19891  575  19893 0
-19889  19890 -19891  575 -19894 0

c  -2-1 --> break 
c    ( b^{115, 5}_2 ∧  b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧ -p_575) -> break
c  in CNF:
c    -b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨  b^{115, 5}_0 ∨  p_575 ∨ break
c  in DIMACS:
-19889 -19890  19891  575 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 5}_2 ∧ -b^{115, 5}_1 ∧ -b^{115, 5}_0 ∧ true) 
c  in CNF:
c    -b^{115, 5}_2 ∨  b^{115, 5}_1 ∨  b^{115, 5}_0 ∨ false 
c  in DIMACS:
-19889  19890  19891  0

c  3 does not represent an automaton state.
c    -(-b^{115, 5}_2 ∧  b^{115, 5}_1 ∧  b^{115, 5}_0 ∧ true) 
c  in CNF:
c     b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ false 
c  in DIMACS:
 19889 -19890 -19891  0
c  -3 does not represent an automaton state.
c    -( b^{115, 5}_2 ∧  b^{115, 5}_1 ∧  b^{115, 5}_0 ∧ true) 
c  in CNF:
c    -b^{115, 5}_2 ∨ -b^{115, 5}_1 ∨ -b^{115, 5}_0 ∨ false 
c  in DIMACS:
-19889 -19890 -19891  0

c i = 6
c  -2+1 --> -1
c    ( b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧  p_690) -> ( b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0)
c  in CNF:
c    -b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨  b^{115, 7}_2
c    -b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_1
c    -b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨  b^{115, 7}_0
c  in DIMACS:
-19892 -19893  19894 -690  19895 0
-19892 -19893  19894 -690 -19896 0
-19892 -19893  19894 -690  19897 0

c  -1+1 --> 0
c    ( b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0 ∧  p_690) -> (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧ -b^{115, 7}_0)
c  in CNF:
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_2
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_1
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_0
c  in DIMACS:
-19892  19893 -19894 -690 -19895 0
-19892  19893 -19894 -690 -19896 0
-19892  19893 -19894 -690 -19897 0

c  0+1 --> 1
c    (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧  p_690) -> (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0)
c  in CNF:
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_2
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_1
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨  b^{115, 7}_0
c  in DIMACS:
 19892  19893  19894 -690 -19895 0
 19892  19893  19894 -690 -19896 0
 19892  19893  19894 -690  19897 0

c  1+1 --> 2
c    (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0 ∧  p_690) -> (-b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0)
c  in CNF:
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_2
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨  b^{115, 7}_1
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ -p_690 ∨ -b^{115, 7}_0
c  in DIMACS:
 19892  19893 -19894 -690 -19895 0
 19892  19893 -19894 -690  19896 0
 19892  19893 -19894 -690 -19897 0

c  2+1 --> break 
c    (-b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧  p_690) -> break
c  in CNF:
c     b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 19892 -19893  19894 -690 1162 0


c  2-1 --> 1
c    (-b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧ -p_690) -> (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0)
c  in CNF:
c     b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_2
c     b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_1
c     b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨  b^{115, 7}_0
c  in DIMACS:
 19892 -19893  19894  690 -19895 0
 19892 -19893  19894  690 -19896 0
 19892 -19893  19894  690  19897 0

c  1-1 --> 0
c    (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0 ∧ -p_690) -> (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧ -b^{115, 7}_0)
c  in CNF:
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_2
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_1
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_0
c  in DIMACS:
 19892  19893 -19894  690 -19895 0
 19892  19893 -19894  690 -19896 0
 19892  19893 -19894  690 -19897 0

c  0-1 --> -1
c    (-b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧ -p_690) -> ( b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0)
c  in CNF:
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨  b^{115, 7}_2
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_1
c     b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨  b^{115, 7}_0
c  in DIMACS:
 19892  19893  19894  690  19895 0
 19892  19893  19894  690 -19896 0
 19892  19893  19894  690  19897 0

c  -1-1 --> -2
c    ( b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧  b^{115, 6}_0 ∧ -p_690) -> ( b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0)
c  in CNF:
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨  b^{115, 7}_2
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨  b^{115, 7}_1
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨  p_690 ∨ -b^{115, 7}_0
c  in DIMACS:
-19892  19893 -19894  690  19895 0
-19892  19893 -19894  690  19896 0
-19892  19893 -19894  690 -19897 0

c  -2-1 --> break 
c    ( b^{115, 6}_2 ∧  b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨  b^{115, 6}_0 ∨  p_690 ∨ break
c  in DIMACS:
-19892 -19893  19894  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 6}_2 ∧ -b^{115, 6}_1 ∧ -b^{115, 6}_0 ∧ true) 
c  in CNF:
c    -b^{115, 6}_2 ∨  b^{115, 6}_1 ∨  b^{115, 6}_0 ∨ false 
c  in DIMACS:
-19892  19893  19894  0

c  3 does not represent an automaton state.
c    -(-b^{115, 6}_2 ∧  b^{115, 6}_1 ∧  b^{115, 6}_0 ∧ true) 
c  in CNF:
c     b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ false 
c  in DIMACS:
 19892 -19893 -19894  0
c  -3 does not represent an automaton state.
c    -( b^{115, 6}_2 ∧  b^{115, 6}_1 ∧  b^{115, 6}_0 ∧ true) 
c  in CNF:
c    -b^{115, 6}_2 ∨ -b^{115, 6}_1 ∨ -b^{115, 6}_0 ∨ false 
c  in DIMACS:
-19892 -19893 -19894  0

c i = 7
c  -2+1 --> -1
c    ( b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧  p_805) -> ( b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0)
c  in CNF:
c    -b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨  b^{115, 8}_2
c    -b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_1
c    -b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨  b^{115, 8}_0
c  in DIMACS:
-19895 -19896  19897 -805  19898 0
-19895 -19896  19897 -805 -19899 0
-19895 -19896  19897 -805  19900 0

c  -1+1 --> 0
c    ( b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0 ∧  p_805) -> (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧ -b^{115, 8}_0)
c  in CNF:
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_2
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_1
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_0
c  in DIMACS:
-19895  19896 -19897 -805 -19898 0
-19895  19896 -19897 -805 -19899 0
-19895  19896 -19897 -805 -19900 0

c  0+1 --> 1
c    (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧  p_805) -> (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0)
c  in CNF:
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_2
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_1
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨  b^{115, 8}_0
c  in DIMACS:
 19895  19896  19897 -805 -19898 0
 19895  19896  19897 -805 -19899 0
 19895  19896  19897 -805  19900 0

c  1+1 --> 2
c    (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0 ∧  p_805) -> (-b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0)
c  in CNF:
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_2
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨  b^{115, 8}_1
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ -p_805 ∨ -b^{115, 8}_0
c  in DIMACS:
 19895  19896 -19897 -805 -19898 0
 19895  19896 -19897 -805  19899 0
 19895  19896 -19897 -805 -19900 0

c  2+1 --> break 
c    (-b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧  p_805) -> break
c  in CNF:
c     b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 19895 -19896  19897 -805 1162 0


c  2-1 --> 1
c    (-b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧ -p_805) -> (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0)
c  in CNF:
c     b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_2
c     b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_1
c     b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨  b^{115, 8}_0
c  in DIMACS:
 19895 -19896  19897  805 -19898 0
 19895 -19896  19897  805 -19899 0
 19895 -19896  19897  805  19900 0

c  1-1 --> 0
c    (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0 ∧ -p_805) -> (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧ -b^{115, 8}_0)
c  in CNF:
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_2
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_1
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_0
c  in DIMACS:
 19895  19896 -19897  805 -19898 0
 19895  19896 -19897  805 -19899 0
 19895  19896 -19897  805 -19900 0

c  0-1 --> -1
c    (-b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧ -p_805) -> ( b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0)
c  in CNF:
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨  b^{115, 8}_2
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_1
c     b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨  b^{115, 8}_0
c  in DIMACS:
 19895  19896  19897  805  19898 0
 19895  19896  19897  805 -19899 0
 19895  19896  19897  805  19900 0

c  -1-1 --> -2
c    ( b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧  b^{115, 7}_0 ∧ -p_805) -> ( b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0)
c  in CNF:
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨  b^{115, 8}_2
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨  b^{115, 8}_1
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨  p_805 ∨ -b^{115, 8}_0
c  in DIMACS:
-19895  19896 -19897  805  19898 0
-19895  19896 -19897  805  19899 0
-19895  19896 -19897  805 -19900 0

c  -2-1 --> break 
c    ( b^{115, 7}_2 ∧  b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨  b^{115, 7}_0 ∨  p_805 ∨ break
c  in DIMACS:
-19895 -19896  19897  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 7}_2 ∧ -b^{115, 7}_1 ∧ -b^{115, 7}_0 ∧ true) 
c  in CNF:
c    -b^{115, 7}_2 ∨  b^{115, 7}_1 ∨  b^{115, 7}_0 ∨ false 
c  in DIMACS:
-19895  19896  19897  0

c  3 does not represent an automaton state.
c    -(-b^{115, 7}_2 ∧  b^{115, 7}_1 ∧  b^{115, 7}_0 ∧ true) 
c  in CNF:
c     b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ false 
c  in DIMACS:
 19895 -19896 -19897  0
c  -3 does not represent an automaton state.
c    -( b^{115, 7}_2 ∧  b^{115, 7}_1 ∧  b^{115, 7}_0 ∧ true) 
c  in CNF:
c    -b^{115, 7}_2 ∨ -b^{115, 7}_1 ∨ -b^{115, 7}_0 ∨ false 
c  in DIMACS:
-19895 -19896 -19897  0

c i = 8
c  -2+1 --> -1
c    ( b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧  p_920) -> ( b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0)
c  in CNF:
c    -b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨  b^{115, 9}_2
c    -b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_1
c    -b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨  b^{115, 9}_0
c  in DIMACS:
-19898 -19899  19900 -920  19901 0
-19898 -19899  19900 -920 -19902 0
-19898 -19899  19900 -920  19903 0

c  -1+1 --> 0
c    ( b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0 ∧  p_920) -> (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧ -b^{115, 9}_0)
c  in CNF:
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_2
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_1
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_0
c  in DIMACS:
-19898  19899 -19900 -920 -19901 0
-19898  19899 -19900 -920 -19902 0
-19898  19899 -19900 -920 -19903 0

c  0+1 --> 1
c    (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧  p_920) -> (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0)
c  in CNF:
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_2
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_1
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨  b^{115, 9}_0
c  in DIMACS:
 19898  19899  19900 -920 -19901 0
 19898  19899  19900 -920 -19902 0
 19898  19899  19900 -920  19903 0

c  1+1 --> 2
c    (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0 ∧  p_920) -> (-b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0)
c  in CNF:
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_2
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨  b^{115, 9}_1
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ -p_920 ∨ -b^{115, 9}_0
c  in DIMACS:
 19898  19899 -19900 -920 -19901 0
 19898  19899 -19900 -920  19902 0
 19898  19899 -19900 -920 -19903 0

c  2+1 --> break 
c    (-b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧  p_920) -> break
c  in CNF:
c     b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 19898 -19899  19900 -920 1162 0


c  2-1 --> 1
c    (-b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧ -p_920) -> (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0)
c  in CNF:
c     b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_2
c     b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_1
c     b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨  b^{115, 9}_0
c  in DIMACS:
 19898 -19899  19900  920 -19901 0
 19898 -19899  19900  920 -19902 0
 19898 -19899  19900  920  19903 0

c  1-1 --> 0
c    (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0 ∧ -p_920) -> (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧ -b^{115, 9}_0)
c  in CNF:
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_2
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_1
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_0
c  in DIMACS:
 19898  19899 -19900  920 -19901 0
 19898  19899 -19900  920 -19902 0
 19898  19899 -19900  920 -19903 0

c  0-1 --> -1
c    (-b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧ -p_920) -> ( b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0)
c  in CNF:
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨  b^{115, 9}_2
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_1
c     b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨  b^{115, 9}_0
c  in DIMACS:
 19898  19899  19900  920  19901 0
 19898  19899  19900  920 -19902 0
 19898  19899  19900  920  19903 0

c  -1-1 --> -2
c    ( b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧  b^{115, 8}_0 ∧ -p_920) -> ( b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0)
c  in CNF:
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨  b^{115, 9}_2
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨  b^{115, 9}_1
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨  p_920 ∨ -b^{115, 9}_0
c  in DIMACS:
-19898  19899 -19900  920  19901 0
-19898  19899 -19900  920  19902 0
-19898  19899 -19900  920 -19903 0

c  -2-1 --> break 
c    ( b^{115, 8}_2 ∧  b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨  b^{115, 8}_0 ∨  p_920 ∨ break
c  in DIMACS:
-19898 -19899  19900  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 8}_2 ∧ -b^{115, 8}_1 ∧ -b^{115, 8}_0 ∧ true) 
c  in CNF:
c    -b^{115, 8}_2 ∨  b^{115, 8}_1 ∨  b^{115, 8}_0 ∨ false 
c  in DIMACS:
-19898  19899  19900  0

c  3 does not represent an automaton state.
c    -(-b^{115, 8}_2 ∧  b^{115, 8}_1 ∧  b^{115, 8}_0 ∧ true) 
c  in CNF:
c     b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ false 
c  in DIMACS:
 19898 -19899 -19900  0
c  -3 does not represent an automaton state.
c    -( b^{115, 8}_2 ∧  b^{115, 8}_1 ∧  b^{115, 8}_0 ∧ true) 
c  in CNF:
c    -b^{115, 8}_2 ∨ -b^{115, 8}_1 ∨ -b^{115, 8}_0 ∨ false 
c  in DIMACS:
-19898 -19899 -19900  0

c i = 9
c  -2+1 --> -1
c    ( b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧  p_1035) -> ( b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0)
c  in CNF:
c    -b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨  b^{115, 10}_2
c    -b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_1
c    -b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨  b^{115, 10}_0
c  in DIMACS:
-19901 -19902  19903 -1035  19904 0
-19901 -19902  19903 -1035 -19905 0
-19901 -19902  19903 -1035  19906 0

c  -1+1 --> 0
c    ( b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0 ∧  p_1035) -> (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧ -b^{115, 10}_0)
c  in CNF:
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_2
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_1
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_0
c  in DIMACS:
-19901  19902 -19903 -1035 -19904 0
-19901  19902 -19903 -1035 -19905 0
-19901  19902 -19903 -1035 -19906 0

c  0+1 --> 1
c    (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧  p_1035) -> (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0)
c  in CNF:
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_2
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_1
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨  b^{115, 10}_0
c  in DIMACS:
 19901  19902  19903 -1035 -19904 0
 19901  19902  19903 -1035 -19905 0
 19901  19902  19903 -1035  19906 0

c  1+1 --> 2
c    (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0 ∧  p_1035) -> (-b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0)
c  in CNF:
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_2
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨  b^{115, 10}_1
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ -p_1035 ∨ -b^{115, 10}_0
c  in DIMACS:
 19901  19902 -19903 -1035 -19904 0
 19901  19902 -19903 -1035  19905 0
 19901  19902 -19903 -1035 -19906 0

c  2+1 --> break 
c    (-b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 19901 -19902  19903 -1035 1162 0


c  2-1 --> 1
c    (-b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧ -p_1035) -> (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0)
c  in CNF:
c     b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_2
c     b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_1
c     b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨  b^{115, 10}_0
c  in DIMACS:
 19901 -19902  19903  1035 -19904 0
 19901 -19902  19903  1035 -19905 0
 19901 -19902  19903  1035  19906 0

c  1-1 --> 0
c    (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0 ∧ -p_1035) -> (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧ -b^{115, 10}_0)
c  in CNF:
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_2
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_1
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_0
c  in DIMACS:
 19901  19902 -19903  1035 -19904 0
 19901  19902 -19903  1035 -19905 0
 19901  19902 -19903  1035 -19906 0

c  0-1 --> -1
c    (-b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧ -p_1035) -> ( b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0)
c  in CNF:
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨  b^{115, 10}_2
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_1
c     b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨  b^{115, 10}_0
c  in DIMACS:
 19901  19902  19903  1035  19904 0
 19901  19902  19903  1035 -19905 0
 19901  19902  19903  1035  19906 0

c  -1-1 --> -2
c    ( b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧  b^{115, 9}_0 ∧ -p_1035) -> ( b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0)
c  in CNF:
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨  b^{115, 10}_2
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨  b^{115, 10}_1
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨  p_1035 ∨ -b^{115, 10}_0
c  in DIMACS:
-19901  19902 -19903  1035  19904 0
-19901  19902 -19903  1035  19905 0
-19901  19902 -19903  1035 -19906 0

c  -2-1 --> break 
c    ( b^{115, 9}_2 ∧  b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨  b^{115, 9}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-19901 -19902  19903  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 9}_2 ∧ -b^{115, 9}_1 ∧ -b^{115, 9}_0 ∧ true) 
c  in CNF:
c    -b^{115, 9}_2 ∨  b^{115, 9}_1 ∨  b^{115, 9}_0 ∨ false 
c  in DIMACS:
-19901  19902  19903  0

c  3 does not represent an automaton state.
c    -(-b^{115, 9}_2 ∧  b^{115, 9}_1 ∧  b^{115, 9}_0 ∧ true) 
c  in CNF:
c     b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ false 
c  in DIMACS:
 19901 -19902 -19903  0
c  -3 does not represent an automaton state.
c    -( b^{115, 9}_2 ∧  b^{115, 9}_1 ∧  b^{115, 9}_0 ∧ true) 
c  in CNF:
c    -b^{115, 9}_2 ∨ -b^{115, 9}_1 ∨ -b^{115, 9}_0 ∨ false 
c  in DIMACS:
-19901 -19902 -19903  0

c i = 10
c  -2+1 --> -1
c    ( b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧  p_1150) -> ( b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧  b^{115, 11}_0)
c  in CNF:
c    -b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨  b^{115, 11}_2
c    -b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_1
c    -b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨  b^{115, 11}_0
c  in DIMACS:
-19904 -19905  19906 -1150  19907 0
-19904 -19905  19906 -1150 -19908 0
-19904 -19905  19906 -1150  19909 0

c  -1+1 --> 0
c    ( b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0 ∧  p_1150) -> (-b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧ -b^{115, 11}_0)
c  in CNF:
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_2
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_1
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_0
c  in DIMACS:
-19904  19905 -19906 -1150 -19907 0
-19904  19905 -19906 -1150 -19908 0
-19904  19905 -19906 -1150 -19909 0

c  0+1 --> 1
c    (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧  p_1150) -> (-b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧  b^{115, 11}_0)
c  in CNF:
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_2
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_1
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨  b^{115, 11}_0
c  in DIMACS:
 19904  19905  19906 -1150 -19907 0
 19904  19905  19906 -1150 -19908 0
 19904  19905  19906 -1150  19909 0

c  1+1 --> 2
c    (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0 ∧  p_1150) -> (-b^{115, 11}_2 ∧  b^{115, 11}_1 ∧ -b^{115, 11}_0)
c  in CNF:
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_2
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨  b^{115, 11}_1
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ -p_1150 ∨ -b^{115, 11}_0
c  in DIMACS:
 19904  19905 -19906 -1150 -19907 0
 19904  19905 -19906 -1150  19908 0
 19904  19905 -19906 -1150 -19909 0

c  2+1 --> break 
c    (-b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 19904 -19905  19906 -1150 1162 0


c  2-1 --> 1
c    (-b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧ -p_1150) -> (-b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧  b^{115, 11}_0)
c  in CNF:
c     b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_2
c     b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_1
c     b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨  b^{115, 11}_0
c  in DIMACS:
 19904 -19905  19906  1150 -19907 0
 19904 -19905  19906  1150 -19908 0
 19904 -19905  19906  1150  19909 0

c  1-1 --> 0
c    (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0 ∧ -p_1150) -> (-b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧ -b^{115, 11}_0)
c  in CNF:
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_2
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_1
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_0
c  in DIMACS:
 19904  19905 -19906  1150 -19907 0
 19904  19905 -19906  1150 -19908 0
 19904  19905 -19906  1150 -19909 0

c  0-1 --> -1
c    (-b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧ -p_1150) -> ( b^{115, 11}_2 ∧ -b^{115, 11}_1 ∧  b^{115, 11}_0)
c  in CNF:
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨  b^{115, 11}_2
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_1
c     b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨  b^{115, 11}_0
c  in DIMACS:
 19904  19905  19906  1150  19907 0
 19904  19905  19906  1150 -19908 0
 19904  19905  19906  1150  19909 0

c  -1-1 --> -2
c    ( b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧  b^{115, 10}_0 ∧ -p_1150) -> ( b^{115, 11}_2 ∧  b^{115, 11}_1 ∧ -b^{115, 11}_0)
c  in CNF:
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨  b^{115, 11}_2
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨  b^{115, 11}_1
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨  p_1150 ∨ -b^{115, 11}_0
c  in DIMACS:
-19904  19905 -19906  1150  19907 0
-19904  19905 -19906  1150  19908 0
-19904  19905 -19906  1150 -19909 0

c  -2-1 --> break 
c    ( b^{115, 10}_2 ∧  b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨  b^{115, 10}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-19904 -19905  19906  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{115, 10}_2 ∧ -b^{115, 10}_1 ∧ -b^{115, 10}_0 ∧ true) 
c  in CNF:
c    -b^{115, 10}_2 ∨  b^{115, 10}_1 ∨  b^{115, 10}_0 ∨ false 
c  in DIMACS:
-19904  19905  19906  0

c  3 does not represent an automaton state.
c    -(-b^{115, 10}_2 ∧  b^{115, 10}_1 ∧  b^{115, 10}_0 ∧ true) 
c  in CNF:
c     b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ false 
c  in DIMACS:
 19904 -19905 -19906  0
c  -3 does not represent an automaton state.
c    -( b^{115, 10}_2 ∧  b^{115, 10}_1 ∧  b^{115, 10}_0 ∧ true) 
c  in CNF:
c    -b^{115, 10}_2 ∨ -b^{115, 10}_1 ∨ -b^{115, 10}_0 ∨ false 
c  in DIMACS:
-19904 -19905 -19906  0

c INIT for k = 116
c    -b^{116, 1}_2
c    -b^{116, 1}_1
c    -b^{116, 1}_0
c  in DIMACS:
-19910 0
-19911 0
-19912 0

c Transitions for k = 116
c i = 1
c  -2+1 --> -1
c    ( b^{116, 1}_2 ∧  b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧  p_116) -> ( b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0)
c  in CNF:
c    -b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨  b^{116, 2}_2
c    -b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_1
c    -b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨  b^{116, 2}_0
c  in DIMACS:
-19910 -19911  19912 -116  19913 0
-19910 -19911  19912 -116 -19914 0
-19910 -19911  19912 -116  19915 0

c  -1+1 --> 0
c    ( b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧  b^{116, 1}_0 ∧  p_116) -> (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧ -b^{116, 2}_0)
c  in CNF:
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_2
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_1
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_0
c  in DIMACS:
-19910  19911 -19912 -116 -19913 0
-19910  19911 -19912 -116 -19914 0
-19910  19911 -19912 -116 -19915 0

c  0+1 --> 1
c    (-b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧  p_116) -> (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0)
c  in CNF:
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_2
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_1
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨  b^{116, 2}_0
c  in DIMACS:
 19910  19911  19912 -116 -19913 0
 19910  19911  19912 -116 -19914 0
 19910  19911  19912 -116  19915 0

c  1+1 --> 2
c    (-b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧  b^{116, 1}_0 ∧  p_116) -> (-b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0)
c  in CNF:
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_2
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨  b^{116, 2}_1
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ -p_116 ∨ -b^{116, 2}_0
c  in DIMACS:
 19910  19911 -19912 -116 -19913 0
 19910  19911 -19912 -116  19914 0
 19910  19911 -19912 -116 -19915 0

c  2+1 --> break 
c    (-b^{116, 1}_2 ∧  b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧  p_116) -> break
c  in CNF:
c     b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ -p_116 ∨ break
c  in DIMACS:
 19910 -19911  19912 -116 1162 0


c  2-1 --> 1
c    (-b^{116, 1}_2 ∧  b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧ -p_116) -> (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0)
c  in CNF:
c     b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_2
c     b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_1
c     b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨  b^{116, 2}_0
c  in DIMACS:
 19910 -19911  19912  116 -19913 0
 19910 -19911  19912  116 -19914 0
 19910 -19911  19912  116  19915 0

c  1-1 --> 0
c    (-b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧  b^{116, 1}_0 ∧ -p_116) -> (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧ -b^{116, 2}_0)
c  in CNF:
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_2
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_1
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_0
c  in DIMACS:
 19910  19911 -19912  116 -19913 0
 19910  19911 -19912  116 -19914 0
 19910  19911 -19912  116 -19915 0

c  0-1 --> -1
c    (-b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧ -p_116) -> ( b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0)
c  in CNF:
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨  b^{116, 2}_2
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_1
c     b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨  b^{116, 2}_0
c  in DIMACS:
 19910  19911  19912  116  19913 0
 19910  19911  19912  116 -19914 0
 19910  19911  19912  116  19915 0

c  -1-1 --> -2
c    ( b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧  b^{116, 1}_0 ∧ -p_116) -> ( b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0)
c  in CNF:
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨  b^{116, 2}_2
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨  b^{116, 2}_1
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨  p_116 ∨ -b^{116, 2}_0
c  in DIMACS:
-19910  19911 -19912  116  19913 0
-19910  19911 -19912  116  19914 0
-19910  19911 -19912  116 -19915 0

c  -2-1 --> break 
c    ( b^{116, 1}_2 ∧  b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧ -p_116) -> break
c  in CNF:
c    -b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨  b^{116, 1}_0 ∨  p_116 ∨ break
c  in DIMACS:
-19910 -19911  19912  116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 1}_2 ∧ -b^{116, 1}_1 ∧ -b^{116, 1}_0 ∧ true) 
c  in CNF:
c    -b^{116, 1}_2 ∨  b^{116, 1}_1 ∨  b^{116, 1}_0 ∨ false 
c  in DIMACS:
-19910  19911  19912  0

c  3 does not represent an automaton state.
c    -(-b^{116, 1}_2 ∧  b^{116, 1}_1 ∧  b^{116, 1}_0 ∧ true) 
c  in CNF:
c     b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ false 
c  in DIMACS:
 19910 -19911 -19912  0
c  -3 does not represent an automaton state.
c    -( b^{116, 1}_2 ∧  b^{116, 1}_1 ∧  b^{116, 1}_0 ∧ true) 
c  in CNF:
c    -b^{116, 1}_2 ∨ -b^{116, 1}_1 ∨ -b^{116, 1}_0 ∨ false 
c  in DIMACS:
-19910 -19911 -19912  0

c i = 2
c  -2+1 --> -1
c    ( b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧  p_232) -> ( b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0)
c  in CNF:
c    -b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨  b^{116, 3}_2
c    -b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_1
c    -b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨  b^{116, 3}_0
c  in DIMACS:
-19913 -19914  19915 -232  19916 0
-19913 -19914  19915 -232 -19917 0
-19913 -19914  19915 -232  19918 0

c  -1+1 --> 0
c    ( b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0 ∧  p_232) -> (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧ -b^{116, 3}_0)
c  in CNF:
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_2
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_1
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_0
c  in DIMACS:
-19913  19914 -19915 -232 -19916 0
-19913  19914 -19915 -232 -19917 0
-19913  19914 -19915 -232 -19918 0

c  0+1 --> 1
c    (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧  p_232) -> (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0)
c  in CNF:
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_2
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_1
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨  b^{116, 3}_0
c  in DIMACS:
 19913  19914  19915 -232 -19916 0
 19913  19914  19915 -232 -19917 0
 19913  19914  19915 -232  19918 0

c  1+1 --> 2
c    (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0 ∧  p_232) -> (-b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0)
c  in CNF:
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_2
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨  b^{116, 3}_1
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ -p_232 ∨ -b^{116, 3}_0
c  in DIMACS:
 19913  19914 -19915 -232 -19916 0
 19913  19914 -19915 -232  19917 0
 19913  19914 -19915 -232 -19918 0

c  2+1 --> break 
c    (-b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧  p_232) -> break
c  in CNF:
c     b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 19913 -19914  19915 -232 1162 0


c  2-1 --> 1
c    (-b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧ -p_232) -> (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0)
c  in CNF:
c     b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_2
c     b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_1
c     b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨  b^{116, 3}_0
c  in DIMACS:
 19913 -19914  19915  232 -19916 0
 19913 -19914  19915  232 -19917 0
 19913 -19914  19915  232  19918 0

c  1-1 --> 0
c    (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0 ∧ -p_232) -> (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧ -b^{116, 3}_0)
c  in CNF:
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_2
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_1
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_0
c  in DIMACS:
 19913  19914 -19915  232 -19916 0
 19913  19914 -19915  232 -19917 0
 19913  19914 -19915  232 -19918 0

c  0-1 --> -1
c    (-b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧ -p_232) -> ( b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0)
c  in CNF:
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨  b^{116, 3}_2
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_1
c     b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨  b^{116, 3}_0
c  in DIMACS:
 19913  19914  19915  232  19916 0
 19913  19914  19915  232 -19917 0
 19913  19914  19915  232  19918 0

c  -1-1 --> -2
c    ( b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧  b^{116, 2}_0 ∧ -p_232) -> ( b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0)
c  in CNF:
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨  b^{116, 3}_2
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨  b^{116, 3}_1
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨  p_232 ∨ -b^{116, 3}_0
c  in DIMACS:
-19913  19914 -19915  232  19916 0
-19913  19914 -19915  232  19917 0
-19913  19914 -19915  232 -19918 0

c  -2-1 --> break 
c    ( b^{116, 2}_2 ∧  b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨  b^{116, 2}_0 ∨  p_232 ∨ break
c  in DIMACS:
-19913 -19914  19915  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 2}_2 ∧ -b^{116, 2}_1 ∧ -b^{116, 2}_0 ∧ true) 
c  in CNF:
c    -b^{116, 2}_2 ∨  b^{116, 2}_1 ∨  b^{116, 2}_0 ∨ false 
c  in DIMACS:
-19913  19914  19915  0

c  3 does not represent an automaton state.
c    -(-b^{116, 2}_2 ∧  b^{116, 2}_1 ∧  b^{116, 2}_0 ∧ true) 
c  in CNF:
c     b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ false 
c  in DIMACS:
 19913 -19914 -19915  0
c  -3 does not represent an automaton state.
c    -( b^{116, 2}_2 ∧  b^{116, 2}_1 ∧  b^{116, 2}_0 ∧ true) 
c  in CNF:
c    -b^{116, 2}_2 ∨ -b^{116, 2}_1 ∨ -b^{116, 2}_0 ∨ false 
c  in DIMACS:
-19913 -19914 -19915  0

c i = 3
c  -2+1 --> -1
c    ( b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧  p_348) -> ( b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0)
c  in CNF:
c    -b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨  b^{116, 4}_2
c    -b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_1
c    -b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨  b^{116, 4}_0
c  in DIMACS:
-19916 -19917  19918 -348  19919 0
-19916 -19917  19918 -348 -19920 0
-19916 -19917  19918 -348  19921 0

c  -1+1 --> 0
c    ( b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0 ∧  p_348) -> (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧ -b^{116, 4}_0)
c  in CNF:
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_2
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_1
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_0
c  in DIMACS:
-19916  19917 -19918 -348 -19919 0
-19916  19917 -19918 -348 -19920 0
-19916  19917 -19918 -348 -19921 0

c  0+1 --> 1
c    (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧  p_348) -> (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0)
c  in CNF:
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_2
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_1
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨  b^{116, 4}_0
c  in DIMACS:
 19916  19917  19918 -348 -19919 0
 19916  19917  19918 -348 -19920 0
 19916  19917  19918 -348  19921 0

c  1+1 --> 2
c    (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0 ∧  p_348) -> (-b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0)
c  in CNF:
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_2
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨  b^{116, 4}_1
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ -p_348 ∨ -b^{116, 4}_0
c  in DIMACS:
 19916  19917 -19918 -348 -19919 0
 19916  19917 -19918 -348  19920 0
 19916  19917 -19918 -348 -19921 0

c  2+1 --> break 
c    (-b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧  p_348) -> break
c  in CNF:
c     b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 19916 -19917  19918 -348 1162 0


c  2-1 --> 1
c    (-b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧ -p_348) -> (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0)
c  in CNF:
c     b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_2
c     b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_1
c     b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨  b^{116, 4}_0
c  in DIMACS:
 19916 -19917  19918  348 -19919 0
 19916 -19917  19918  348 -19920 0
 19916 -19917  19918  348  19921 0

c  1-1 --> 0
c    (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0 ∧ -p_348) -> (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧ -b^{116, 4}_0)
c  in CNF:
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_2
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_1
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_0
c  in DIMACS:
 19916  19917 -19918  348 -19919 0
 19916  19917 -19918  348 -19920 0
 19916  19917 -19918  348 -19921 0

c  0-1 --> -1
c    (-b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧ -p_348) -> ( b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0)
c  in CNF:
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨  b^{116, 4}_2
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_1
c     b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨  b^{116, 4}_0
c  in DIMACS:
 19916  19917  19918  348  19919 0
 19916  19917  19918  348 -19920 0
 19916  19917  19918  348  19921 0

c  -1-1 --> -2
c    ( b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧  b^{116, 3}_0 ∧ -p_348) -> ( b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0)
c  in CNF:
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨  b^{116, 4}_2
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨  b^{116, 4}_1
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨  p_348 ∨ -b^{116, 4}_0
c  in DIMACS:
-19916  19917 -19918  348  19919 0
-19916  19917 -19918  348  19920 0
-19916  19917 -19918  348 -19921 0

c  -2-1 --> break 
c    ( b^{116, 3}_2 ∧  b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨  b^{116, 3}_0 ∨  p_348 ∨ break
c  in DIMACS:
-19916 -19917  19918  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 3}_2 ∧ -b^{116, 3}_1 ∧ -b^{116, 3}_0 ∧ true) 
c  in CNF:
c    -b^{116, 3}_2 ∨  b^{116, 3}_1 ∨  b^{116, 3}_0 ∨ false 
c  in DIMACS:
-19916  19917  19918  0

c  3 does not represent an automaton state.
c    -(-b^{116, 3}_2 ∧  b^{116, 3}_1 ∧  b^{116, 3}_0 ∧ true) 
c  in CNF:
c     b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ false 
c  in DIMACS:
 19916 -19917 -19918  0
c  -3 does not represent an automaton state.
c    -( b^{116, 3}_2 ∧  b^{116, 3}_1 ∧  b^{116, 3}_0 ∧ true) 
c  in CNF:
c    -b^{116, 3}_2 ∨ -b^{116, 3}_1 ∨ -b^{116, 3}_0 ∨ false 
c  in DIMACS:
-19916 -19917 -19918  0

c i = 4
c  -2+1 --> -1
c    ( b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧  p_464) -> ( b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0)
c  in CNF:
c    -b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨  b^{116, 5}_2
c    -b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_1
c    -b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨  b^{116, 5}_0
c  in DIMACS:
-19919 -19920  19921 -464  19922 0
-19919 -19920  19921 -464 -19923 0
-19919 -19920  19921 -464  19924 0

c  -1+1 --> 0
c    ( b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0 ∧  p_464) -> (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧ -b^{116, 5}_0)
c  in CNF:
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_2
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_1
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_0
c  in DIMACS:
-19919  19920 -19921 -464 -19922 0
-19919  19920 -19921 -464 -19923 0
-19919  19920 -19921 -464 -19924 0

c  0+1 --> 1
c    (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧  p_464) -> (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0)
c  in CNF:
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_2
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_1
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨  b^{116, 5}_0
c  in DIMACS:
 19919  19920  19921 -464 -19922 0
 19919  19920  19921 -464 -19923 0
 19919  19920  19921 -464  19924 0

c  1+1 --> 2
c    (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0 ∧  p_464) -> (-b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0)
c  in CNF:
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_2
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨  b^{116, 5}_1
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ -p_464 ∨ -b^{116, 5}_0
c  in DIMACS:
 19919  19920 -19921 -464 -19922 0
 19919  19920 -19921 -464  19923 0
 19919  19920 -19921 -464 -19924 0

c  2+1 --> break 
c    (-b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧  p_464) -> break
c  in CNF:
c     b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 19919 -19920  19921 -464 1162 0


c  2-1 --> 1
c    (-b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧ -p_464) -> (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0)
c  in CNF:
c     b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_2
c     b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_1
c     b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨  b^{116, 5}_0
c  in DIMACS:
 19919 -19920  19921  464 -19922 0
 19919 -19920  19921  464 -19923 0
 19919 -19920  19921  464  19924 0

c  1-1 --> 0
c    (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0 ∧ -p_464) -> (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧ -b^{116, 5}_0)
c  in CNF:
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_2
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_1
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_0
c  in DIMACS:
 19919  19920 -19921  464 -19922 0
 19919  19920 -19921  464 -19923 0
 19919  19920 -19921  464 -19924 0

c  0-1 --> -1
c    (-b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧ -p_464) -> ( b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0)
c  in CNF:
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨  b^{116, 5}_2
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_1
c     b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨  b^{116, 5}_0
c  in DIMACS:
 19919  19920  19921  464  19922 0
 19919  19920  19921  464 -19923 0
 19919  19920  19921  464  19924 0

c  -1-1 --> -2
c    ( b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧  b^{116, 4}_0 ∧ -p_464) -> ( b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0)
c  in CNF:
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨  b^{116, 5}_2
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨  b^{116, 5}_1
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨  p_464 ∨ -b^{116, 5}_0
c  in DIMACS:
-19919  19920 -19921  464  19922 0
-19919  19920 -19921  464  19923 0
-19919  19920 -19921  464 -19924 0

c  -2-1 --> break 
c    ( b^{116, 4}_2 ∧  b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨  b^{116, 4}_0 ∨  p_464 ∨ break
c  in DIMACS:
-19919 -19920  19921  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 4}_2 ∧ -b^{116, 4}_1 ∧ -b^{116, 4}_0 ∧ true) 
c  in CNF:
c    -b^{116, 4}_2 ∨  b^{116, 4}_1 ∨  b^{116, 4}_0 ∨ false 
c  in DIMACS:
-19919  19920  19921  0

c  3 does not represent an automaton state.
c    -(-b^{116, 4}_2 ∧  b^{116, 4}_1 ∧  b^{116, 4}_0 ∧ true) 
c  in CNF:
c     b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ false 
c  in DIMACS:
 19919 -19920 -19921  0
c  -3 does not represent an automaton state.
c    -( b^{116, 4}_2 ∧  b^{116, 4}_1 ∧  b^{116, 4}_0 ∧ true) 
c  in CNF:
c    -b^{116, 4}_2 ∨ -b^{116, 4}_1 ∨ -b^{116, 4}_0 ∨ false 
c  in DIMACS:
-19919 -19920 -19921  0

c i = 5
c  -2+1 --> -1
c    ( b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧  p_580) -> ( b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0)
c  in CNF:
c    -b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨  b^{116, 6}_2
c    -b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_1
c    -b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨  b^{116, 6}_0
c  in DIMACS:
-19922 -19923  19924 -580  19925 0
-19922 -19923  19924 -580 -19926 0
-19922 -19923  19924 -580  19927 0

c  -1+1 --> 0
c    ( b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0 ∧  p_580) -> (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧ -b^{116, 6}_0)
c  in CNF:
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_2
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_1
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_0
c  in DIMACS:
-19922  19923 -19924 -580 -19925 0
-19922  19923 -19924 -580 -19926 0
-19922  19923 -19924 -580 -19927 0

c  0+1 --> 1
c    (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧  p_580) -> (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0)
c  in CNF:
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_2
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_1
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨  b^{116, 6}_0
c  in DIMACS:
 19922  19923  19924 -580 -19925 0
 19922  19923  19924 -580 -19926 0
 19922  19923  19924 -580  19927 0

c  1+1 --> 2
c    (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0 ∧  p_580) -> (-b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0)
c  in CNF:
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_2
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨  b^{116, 6}_1
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ -p_580 ∨ -b^{116, 6}_0
c  in DIMACS:
 19922  19923 -19924 -580 -19925 0
 19922  19923 -19924 -580  19926 0
 19922  19923 -19924 -580 -19927 0

c  2+1 --> break 
c    (-b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧  p_580) -> break
c  in CNF:
c     b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 19922 -19923  19924 -580 1162 0


c  2-1 --> 1
c    (-b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧ -p_580) -> (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0)
c  in CNF:
c     b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_2
c     b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_1
c     b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨  b^{116, 6}_0
c  in DIMACS:
 19922 -19923  19924  580 -19925 0
 19922 -19923  19924  580 -19926 0
 19922 -19923  19924  580  19927 0

c  1-1 --> 0
c    (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0 ∧ -p_580) -> (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧ -b^{116, 6}_0)
c  in CNF:
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_2
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_1
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_0
c  in DIMACS:
 19922  19923 -19924  580 -19925 0
 19922  19923 -19924  580 -19926 0
 19922  19923 -19924  580 -19927 0

c  0-1 --> -1
c    (-b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧ -p_580) -> ( b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0)
c  in CNF:
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨  b^{116, 6}_2
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_1
c     b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨  b^{116, 6}_0
c  in DIMACS:
 19922  19923  19924  580  19925 0
 19922  19923  19924  580 -19926 0
 19922  19923  19924  580  19927 0

c  -1-1 --> -2
c    ( b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧  b^{116, 5}_0 ∧ -p_580) -> ( b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0)
c  in CNF:
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨  b^{116, 6}_2
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨  b^{116, 6}_1
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨  p_580 ∨ -b^{116, 6}_0
c  in DIMACS:
-19922  19923 -19924  580  19925 0
-19922  19923 -19924  580  19926 0
-19922  19923 -19924  580 -19927 0

c  -2-1 --> break 
c    ( b^{116, 5}_2 ∧  b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨  b^{116, 5}_0 ∨  p_580 ∨ break
c  in DIMACS:
-19922 -19923  19924  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 5}_2 ∧ -b^{116, 5}_1 ∧ -b^{116, 5}_0 ∧ true) 
c  in CNF:
c    -b^{116, 5}_2 ∨  b^{116, 5}_1 ∨  b^{116, 5}_0 ∨ false 
c  in DIMACS:
-19922  19923  19924  0

c  3 does not represent an automaton state.
c    -(-b^{116, 5}_2 ∧  b^{116, 5}_1 ∧  b^{116, 5}_0 ∧ true) 
c  in CNF:
c     b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ false 
c  in DIMACS:
 19922 -19923 -19924  0
c  -3 does not represent an automaton state.
c    -( b^{116, 5}_2 ∧  b^{116, 5}_1 ∧  b^{116, 5}_0 ∧ true) 
c  in CNF:
c    -b^{116, 5}_2 ∨ -b^{116, 5}_1 ∨ -b^{116, 5}_0 ∨ false 
c  in DIMACS:
-19922 -19923 -19924  0

c i = 6
c  -2+1 --> -1
c    ( b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧  p_696) -> ( b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0)
c  in CNF:
c    -b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨  b^{116, 7}_2
c    -b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_1
c    -b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨  b^{116, 7}_0
c  in DIMACS:
-19925 -19926  19927 -696  19928 0
-19925 -19926  19927 -696 -19929 0
-19925 -19926  19927 -696  19930 0

c  -1+1 --> 0
c    ( b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0 ∧  p_696) -> (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧ -b^{116, 7}_0)
c  in CNF:
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_2
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_1
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_0
c  in DIMACS:
-19925  19926 -19927 -696 -19928 0
-19925  19926 -19927 -696 -19929 0
-19925  19926 -19927 -696 -19930 0

c  0+1 --> 1
c    (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧  p_696) -> (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0)
c  in CNF:
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_2
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_1
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨  b^{116, 7}_0
c  in DIMACS:
 19925  19926  19927 -696 -19928 0
 19925  19926  19927 -696 -19929 0
 19925  19926  19927 -696  19930 0

c  1+1 --> 2
c    (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0 ∧  p_696) -> (-b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0)
c  in CNF:
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_2
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨  b^{116, 7}_1
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ -p_696 ∨ -b^{116, 7}_0
c  in DIMACS:
 19925  19926 -19927 -696 -19928 0
 19925  19926 -19927 -696  19929 0
 19925  19926 -19927 -696 -19930 0

c  2+1 --> break 
c    (-b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧  p_696) -> break
c  in CNF:
c     b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 19925 -19926  19927 -696 1162 0


c  2-1 --> 1
c    (-b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧ -p_696) -> (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0)
c  in CNF:
c     b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_2
c     b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_1
c     b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨  b^{116, 7}_0
c  in DIMACS:
 19925 -19926  19927  696 -19928 0
 19925 -19926  19927  696 -19929 0
 19925 -19926  19927  696  19930 0

c  1-1 --> 0
c    (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0 ∧ -p_696) -> (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧ -b^{116, 7}_0)
c  in CNF:
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_2
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_1
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_0
c  in DIMACS:
 19925  19926 -19927  696 -19928 0
 19925  19926 -19927  696 -19929 0
 19925  19926 -19927  696 -19930 0

c  0-1 --> -1
c    (-b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧ -p_696) -> ( b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0)
c  in CNF:
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨  b^{116, 7}_2
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_1
c     b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨  b^{116, 7}_0
c  in DIMACS:
 19925  19926  19927  696  19928 0
 19925  19926  19927  696 -19929 0
 19925  19926  19927  696  19930 0

c  -1-1 --> -2
c    ( b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧  b^{116, 6}_0 ∧ -p_696) -> ( b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0)
c  in CNF:
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨  b^{116, 7}_2
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨  b^{116, 7}_1
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨  p_696 ∨ -b^{116, 7}_0
c  in DIMACS:
-19925  19926 -19927  696  19928 0
-19925  19926 -19927  696  19929 0
-19925  19926 -19927  696 -19930 0

c  -2-1 --> break 
c    ( b^{116, 6}_2 ∧  b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨  b^{116, 6}_0 ∨  p_696 ∨ break
c  in DIMACS:
-19925 -19926  19927  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 6}_2 ∧ -b^{116, 6}_1 ∧ -b^{116, 6}_0 ∧ true) 
c  in CNF:
c    -b^{116, 6}_2 ∨  b^{116, 6}_1 ∨  b^{116, 6}_0 ∨ false 
c  in DIMACS:
-19925  19926  19927  0

c  3 does not represent an automaton state.
c    -(-b^{116, 6}_2 ∧  b^{116, 6}_1 ∧  b^{116, 6}_0 ∧ true) 
c  in CNF:
c     b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ false 
c  in DIMACS:
 19925 -19926 -19927  0
c  -3 does not represent an automaton state.
c    -( b^{116, 6}_2 ∧  b^{116, 6}_1 ∧  b^{116, 6}_0 ∧ true) 
c  in CNF:
c    -b^{116, 6}_2 ∨ -b^{116, 6}_1 ∨ -b^{116, 6}_0 ∨ false 
c  in DIMACS:
-19925 -19926 -19927  0

c i = 7
c  -2+1 --> -1
c    ( b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧  p_812) -> ( b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0)
c  in CNF:
c    -b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨  b^{116, 8}_2
c    -b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_1
c    -b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨  b^{116, 8}_0
c  in DIMACS:
-19928 -19929  19930 -812  19931 0
-19928 -19929  19930 -812 -19932 0
-19928 -19929  19930 -812  19933 0

c  -1+1 --> 0
c    ( b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0 ∧  p_812) -> (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧ -b^{116, 8}_0)
c  in CNF:
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_2
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_1
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_0
c  in DIMACS:
-19928  19929 -19930 -812 -19931 0
-19928  19929 -19930 -812 -19932 0
-19928  19929 -19930 -812 -19933 0

c  0+1 --> 1
c    (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧  p_812) -> (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0)
c  in CNF:
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_2
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_1
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨  b^{116, 8}_0
c  in DIMACS:
 19928  19929  19930 -812 -19931 0
 19928  19929  19930 -812 -19932 0
 19928  19929  19930 -812  19933 0

c  1+1 --> 2
c    (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0 ∧  p_812) -> (-b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0)
c  in CNF:
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_2
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨  b^{116, 8}_1
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ -p_812 ∨ -b^{116, 8}_0
c  in DIMACS:
 19928  19929 -19930 -812 -19931 0
 19928  19929 -19930 -812  19932 0
 19928  19929 -19930 -812 -19933 0

c  2+1 --> break 
c    (-b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧  p_812) -> break
c  in CNF:
c     b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 19928 -19929  19930 -812 1162 0


c  2-1 --> 1
c    (-b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧ -p_812) -> (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0)
c  in CNF:
c     b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_2
c     b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_1
c     b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨  b^{116, 8}_0
c  in DIMACS:
 19928 -19929  19930  812 -19931 0
 19928 -19929  19930  812 -19932 0
 19928 -19929  19930  812  19933 0

c  1-1 --> 0
c    (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0 ∧ -p_812) -> (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧ -b^{116, 8}_0)
c  in CNF:
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_2
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_1
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_0
c  in DIMACS:
 19928  19929 -19930  812 -19931 0
 19928  19929 -19930  812 -19932 0
 19928  19929 -19930  812 -19933 0

c  0-1 --> -1
c    (-b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧ -p_812) -> ( b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0)
c  in CNF:
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨  b^{116, 8}_2
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_1
c     b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨  b^{116, 8}_0
c  in DIMACS:
 19928  19929  19930  812  19931 0
 19928  19929  19930  812 -19932 0
 19928  19929  19930  812  19933 0

c  -1-1 --> -2
c    ( b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧  b^{116, 7}_0 ∧ -p_812) -> ( b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0)
c  in CNF:
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨  b^{116, 8}_2
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨  b^{116, 8}_1
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨  p_812 ∨ -b^{116, 8}_0
c  in DIMACS:
-19928  19929 -19930  812  19931 0
-19928  19929 -19930  812  19932 0
-19928  19929 -19930  812 -19933 0

c  -2-1 --> break 
c    ( b^{116, 7}_2 ∧  b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨  b^{116, 7}_0 ∨  p_812 ∨ break
c  in DIMACS:
-19928 -19929  19930  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 7}_2 ∧ -b^{116, 7}_1 ∧ -b^{116, 7}_0 ∧ true) 
c  in CNF:
c    -b^{116, 7}_2 ∨  b^{116, 7}_1 ∨  b^{116, 7}_0 ∨ false 
c  in DIMACS:
-19928  19929  19930  0

c  3 does not represent an automaton state.
c    -(-b^{116, 7}_2 ∧  b^{116, 7}_1 ∧  b^{116, 7}_0 ∧ true) 
c  in CNF:
c     b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ false 
c  in DIMACS:
 19928 -19929 -19930  0
c  -3 does not represent an automaton state.
c    -( b^{116, 7}_2 ∧  b^{116, 7}_1 ∧  b^{116, 7}_0 ∧ true) 
c  in CNF:
c    -b^{116, 7}_2 ∨ -b^{116, 7}_1 ∨ -b^{116, 7}_0 ∨ false 
c  in DIMACS:
-19928 -19929 -19930  0

c i = 8
c  -2+1 --> -1
c    ( b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧  p_928) -> ( b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0)
c  in CNF:
c    -b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨  b^{116, 9}_2
c    -b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_1
c    -b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨  b^{116, 9}_0
c  in DIMACS:
-19931 -19932  19933 -928  19934 0
-19931 -19932  19933 -928 -19935 0
-19931 -19932  19933 -928  19936 0

c  -1+1 --> 0
c    ( b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0 ∧  p_928) -> (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧ -b^{116, 9}_0)
c  in CNF:
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_2
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_1
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_0
c  in DIMACS:
-19931  19932 -19933 -928 -19934 0
-19931  19932 -19933 -928 -19935 0
-19931  19932 -19933 -928 -19936 0

c  0+1 --> 1
c    (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧  p_928) -> (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0)
c  in CNF:
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_2
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_1
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨  b^{116, 9}_0
c  in DIMACS:
 19931  19932  19933 -928 -19934 0
 19931  19932  19933 -928 -19935 0
 19931  19932  19933 -928  19936 0

c  1+1 --> 2
c    (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0 ∧  p_928) -> (-b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0)
c  in CNF:
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_2
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨  b^{116, 9}_1
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ -p_928 ∨ -b^{116, 9}_0
c  in DIMACS:
 19931  19932 -19933 -928 -19934 0
 19931  19932 -19933 -928  19935 0
 19931  19932 -19933 -928 -19936 0

c  2+1 --> break 
c    (-b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧  p_928) -> break
c  in CNF:
c     b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 19931 -19932  19933 -928 1162 0


c  2-1 --> 1
c    (-b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧ -p_928) -> (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0)
c  in CNF:
c     b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_2
c     b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_1
c     b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨  b^{116, 9}_0
c  in DIMACS:
 19931 -19932  19933  928 -19934 0
 19931 -19932  19933  928 -19935 0
 19931 -19932  19933  928  19936 0

c  1-1 --> 0
c    (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0 ∧ -p_928) -> (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧ -b^{116, 9}_0)
c  in CNF:
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_2
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_1
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_0
c  in DIMACS:
 19931  19932 -19933  928 -19934 0
 19931  19932 -19933  928 -19935 0
 19931  19932 -19933  928 -19936 0

c  0-1 --> -1
c    (-b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧ -p_928) -> ( b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0)
c  in CNF:
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨  b^{116, 9}_2
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_1
c     b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨  b^{116, 9}_0
c  in DIMACS:
 19931  19932  19933  928  19934 0
 19931  19932  19933  928 -19935 0
 19931  19932  19933  928  19936 0

c  -1-1 --> -2
c    ( b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧  b^{116, 8}_0 ∧ -p_928) -> ( b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0)
c  in CNF:
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨  b^{116, 9}_2
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨  b^{116, 9}_1
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨  p_928 ∨ -b^{116, 9}_0
c  in DIMACS:
-19931  19932 -19933  928  19934 0
-19931  19932 -19933  928  19935 0
-19931  19932 -19933  928 -19936 0

c  -2-1 --> break 
c    ( b^{116, 8}_2 ∧  b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨  b^{116, 8}_0 ∨  p_928 ∨ break
c  in DIMACS:
-19931 -19932  19933  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 8}_2 ∧ -b^{116, 8}_1 ∧ -b^{116, 8}_0 ∧ true) 
c  in CNF:
c    -b^{116, 8}_2 ∨  b^{116, 8}_1 ∨  b^{116, 8}_0 ∨ false 
c  in DIMACS:
-19931  19932  19933  0

c  3 does not represent an automaton state.
c    -(-b^{116, 8}_2 ∧  b^{116, 8}_1 ∧  b^{116, 8}_0 ∧ true) 
c  in CNF:
c     b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ false 
c  in DIMACS:
 19931 -19932 -19933  0
c  -3 does not represent an automaton state.
c    -( b^{116, 8}_2 ∧  b^{116, 8}_1 ∧  b^{116, 8}_0 ∧ true) 
c  in CNF:
c    -b^{116, 8}_2 ∨ -b^{116, 8}_1 ∨ -b^{116, 8}_0 ∨ false 
c  in DIMACS:
-19931 -19932 -19933  0

c i = 9
c  -2+1 --> -1
c    ( b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧  p_1044) -> ( b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0)
c  in CNF:
c    -b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨  b^{116, 10}_2
c    -b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_1
c    -b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨  b^{116, 10}_0
c  in DIMACS:
-19934 -19935  19936 -1044  19937 0
-19934 -19935  19936 -1044 -19938 0
-19934 -19935  19936 -1044  19939 0

c  -1+1 --> 0
c    ( b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0 ∧  p_1044) -> (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧ -b^{116, 10}_0)
c  in CNF:
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_2
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_1
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_0
c  in DIMACS:
-19934  19935 -19936 -1044 -19937 0
-19934  19935 -19936 -1044 -19938 0
-19934  19935 -19936 -1044 -19939 0

c  0+1 --> 1
c    (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧  p_1044) -> (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0)
c  in CNF:
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_2
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_1
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨  b^{116, 10}_0
c  in DIMACS:
 19934  19935  19936 -1044 -19937 0
 19934  19935  19936 -1044 -19938 0
 19934  19935  19936 -1044  19939 0

c  1+1 --> 2
c    (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0 ∧  p_1044) -> (-b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0)
c  in CNF:
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_2
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨  b^{116, 10}_1
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ -p_1044 ∨ -b^{116, 10}_0
c  in DIMACS:
 19934  19935 -19936 -1044 -19937 0
 19934  19935 -19936 -1044  19938 0
 19934  19935 -19936 -1044 -19939 0

c  2+1 --> break 
c    (-b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 19934 -19935  19936 -1044 1162 0


c  2-1 --> 1
c    (-b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧ -p_1044) -> (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0)
c  in CNF:
c     b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_2
c     b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_1
c     b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨  b^{116, 10}_0
c  in DIMACS:
 19934 -19935  19936  1044 -19937 0
 19934 -19935  19936  1044 -19938 0
 19934 -19935  19936  1044  19939 0

c  1-1 --> 0
c    (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0 ∧ -p_1044) -> (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧ -b^{116, 10}_0)
c  in CNF:
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_2
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_1
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_0
c  in DIMACS:
 19934  19935 -19936  1044 -19937 0
 19934  19935 -19936  1044 -19938 0
 19934  19935 -19936  1044 -19939 0

c  0-1 --> -1
c    (-b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧ -p_1044) -> ( b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0)
c  in CNF:
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨  b^{116, 10}_2
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_1
c     b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨  b^{116, 10}_0
c  in DIMACS:
 19934  19935  19936  1044  19937 0
 19934  19935  19936  1044 -19938 0
 19934  19935  19936  1044  19939 0

c  -1-1 --> -2
c    ( b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧  b^{116, 9}_0 ∧ -p_1044) -> ( b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0)
c  in CNF:
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨  b^{116, 10}_2
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨  b^{116, 10}_1
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨  p_1044 ∨ -b^{116, 10}_0
c  in DIMACS:
-19934  19935 -19936  1044  19937 0
-19934  19935 -19936  1044  19938 0
-19934  19935 -19936  1044 -19939 0

c  -2-1 --> break 
c    ( b^{116, 9}_2 ∧  b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨  b^{116, 9}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-19934 -19935  19936  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 9}_2 ∧ -b^{116, 9}_1 ∧ -b^{116, 9}_0 ∧ true) 
c  in CNF:
c    -b^{116, 9}_2 ∨  b^{116, 9}_1 ∨  b^{116, 9}_0 ∨ false 
c  in DIMACS:
-19934  19935  19936  0

c  3 does not represent an automaton state.
c    -(-b^{116, 9}_2 ∧  b^{116, 9}_1 ∧  b^{116, 9}_0 ∧ true) 
c  in CNF:
c     b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ false 
c  in DIMACS:
 19934 -19935 -19936  0
c  -3 does not represent an automaton state.
c    -( b^{116, 9}_2 ∧  b^{116, 9}_1 ∧  b^{116, 9}_0 ∧ true) 
c  in CNF:
c    -b^{116, 9}_2 ∨ -b^{116, 9}_1 ∨ -b^{116, 9}_0 ∨ false 
c  in DIMACS:
-19934 -19935 -19936  0

c i = 10
c  -2+1 --> -1
c    ( b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧  p_1160) -> ( b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧  b^{116, 11}_0)
c  in CNF:
c    -b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨  b^{116, 11}_2
c    -b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_1
c    -b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨  b^{116, 11}_0
c  in DIMACS:
-19937 -19938  19939 -1160  19940 0
-19937 -19938  19939 -1160 -19941 0
-19937 -19938  19939 -1160  19942 0

c  -1+1 --> 0
c    ( b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0 ∧  p_1160) -> (-b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧ -b^{116, 11}_0)
c  in CNF:
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_2
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_1
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_0
c  in DIMACS:
-19937  19938 -19939 -1160 -19940 0
-19937  19938 -19939 -1160 -19941 0
-19937  19938 -19939 -1160 -19942 0

c  0+1 --> 1
c    (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧  p_1160) -> (-b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧  b^{116, 11}_0)
c  in CNF:
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_2
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_1
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨  b^{116, 11}_0
c  in DIMACS:
 19937  19938  19939 -1160 -19940 0
 19937  19938  19939 -1160 -19941 0
 19937  19938  19939 -1160  19942 0

c  1+1 --> 2
c    (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0 ∧  p_1160) -> (-b^{116, 11}_2 ∧  b^{116, 11}_1 ∧ -b^{116, 11}_0)
c  in CNF:
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_2
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨  b^{116, 11}_1
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ -p_1160 ∨ -b^{116, 11}_0
c  in DIMACS:
 19937  19938 -19939 -1160 -19940 0
 19937  19938 -19939 -1160  19941 0
 19937  19938 -19939 -1160 -19942 0

c  2+1 --> break 
c    (-b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 19937 -19938  19939 -1160 1162 0


c  2-1 --> 1
c    (-b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧ -p_1160) -> (-b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧  b^{116, 11}_0)
c  in CNF:
c     b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_2
c     b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_1
c     b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨  b^{116, 11}_0
c  in DIMACS:
 19937 -19938  19939  1160 -19940 0
 19937 -19938  19939  1160 -19941 0
 19937 -19938  19939  1160  19942 0

c  1-1 --> 0
c    (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0 ∧ -p_1160) -> (-b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧ -b^{116, 11}_0)
c  in CNF:
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_2
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_1
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_0
c  in DIMACS:
 19937  19938 -19939  1160 -19940 0
 19937  19938 -19939  1160 -19941 0
 19937  19938 -19939  1160 -19942 0

c  0-1 --> -1
c    (-b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧ -p_1160) -> ( b^{116, 11}_2 ∧ -b^{116, 11}_1 ∧  b^{116, 11}_0)
c  in CNF:
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨  b^{116, 11}_2
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_1
c     b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨  b^{116, 11}_0
c  in DIMACS:
 19937  19938  19939  1160  19940 0
 19937  19938  19939  1160 -19941 0
 19937  19938  19939  1160  19942 0

c  -1-1 --> -2
c    ( b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧  b^{116, 10}_0 ∧ -p_1160) -> ( b^{116, 11}_2 ∧  b^{116, 11}_1 ∧ -b^{116, 11}_0)
c  in CNF:
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨  b^{116, 11}_2
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨  b^{116, 11}_1
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨  p_1160 ∨ -b^{116, 11}_0
c  in DIMACS:
-19937  19938 -19939  1160  19940 0
-19937  19938 -19939  1160  19941 0
-19937  19938 -19939  1160 -19942 0

c  -2-1 --> break 
c    ( b^{116, 10}_2 ∧  b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨  b^{116, 10}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-19937 -19938  19939  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{116, 10}_2 ∧ -b^{116, 10}_1 ∧ -b^{116, 10}_0 ∧ true) 
c  in CNF:
c    -b^{116, 10}_2 ∨  b^{116, 10}_1 ∨  b^{116, 10}_0 ∨ false 
c  in DIMACS:
-19937  19938  19939  0

c  3 does not represent an automaton state.
c    -(-b^{116, 10}_2 ∧  b^{116, 10}_1 ∧  b^{116, 10}_0 ∧ true) 
c  in CNF:
c     b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ false 
c  in DIMACS:
 19937 -19938 -19939  0
c  -3 does not represent an automaton state.
c    -( b^{116, 10}_2 ∧  b^{116, 10}_1 ∧  b^{116, 10}_0 ∧ true) 
c  in CNF:
c    -b^{116, 10}_2 ∨ -b^{116, 10}_1 ∨ -b^{116, 10}_0 ∨ false 
c  in DIMACS:
-19937 -19938 -19939  0

c INIT for k = 117
c    -b^{117, 1}_2
c    -b^{117, 1}_1
c    -b^{117, 1}_0
c  in DIMACS:
-19943 0
-19944 0
-19945 0

c Transitions for k = 117
c i = 1
c  -2+1 --> -1
c    ( b^{117, 1}_2 ∧  b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧  p_117) -> ( b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0)
c  in CNF:
c    -b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨  b^{117, 2}_2
c    -b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_1
c    -b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨  b^{117, 2}_0
c  in DIMACS:
-19943 -19944  19945 -117  19946 0
-19943 -19944  19945 -117 -19947 0
-19943 -19944  19945 -117  19948 0

c  -1+1 --> 0
c    ( b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧  b^{117, 1}_0 ∧  p_117) -> (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧ -b^{117, 2}_0)
c  in CNF:
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_2
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_1
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_0
c  in DIMACS:
-19943  19944 -19945 -117 -19946 0
-19943  19944 -19945 -117 -19947 0
-19943  19944 -19945 -117 -19948 0

c  0+1 --> 1
c    (-b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧  p_117) -> (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0)
c  in CNF:
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_2
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_1
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨  b^{117, 2}_0
c  in DIMACS:
 19943  19944  19945 -117 -19946 0
 19943  19944  19945 -117 -19947 0
 19943  19944  19945 -117  19948 0

c  1+1 --> 2
c    (-b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧  b^{117, 1}_0 ∧  p_117) -> (-b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0)
c  in CNF:
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_2
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨  b^{117, 2}_1
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ -p_117 ∨ -b^{117, 2}_0
c  in DIMACS:
 19943  19944 -19945 -117 -19946 0
 19943  19944 -19945 -117  19947 0
 19943  19944 -19945 -117 -19948 0

c  2+1 --> break 
c    (-b^{117, 1}_2 ∧  b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧  p_117) -> break
c  in CNF:
c     b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ -p_117 ∨ break
c  in DIMACS:
 19943 -19944  19945 -117 1162 0


c  2-1 --> 1
c    (-b^{117, 1}_2 ∧  b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧ -p_117) -> (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0)
c  in CNF:
c     b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_2
c     b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_1
c     b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨  b^{117, 2}_0
c  in DIMACS:
 19943 -19944  19945  117 -19946 0
 19943 -19944  19945  117 -19947 0
 19943 -19944  19945  117  19948 0

c  1-1 --> 0
c    (-b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧  b^{117, 1}_0 ∧ -p_117) -> (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧ -b^{117, 2}_0)
c  in CNF:
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_2
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_1
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_0
c  in DIMACS:
 19943  19944 -19945  117 -19946 0
 19943  19944 -19945  117 -19947 0
 19943  19944 -19945  117 -19948 0

c  0-1 --> -1
c    (-b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧ -p_117) -> ( b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0)
c  in CNF:
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨  b^{117, 2}_2
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_1
c     b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨  b^{117, 2}_0
c  in DIMACS:
 19943  19944  19945  117  19946 0
 19943  19944  19945  117 -19947 0
 19943  19944  19945  117  19948 0

c  -1-1 --> -2
c    ( b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧  b^{117, 1}_0 ∧ -p_117) -> ( b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0)
c  in CNF:
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨  b^{117, 2}_2
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨  b^{117, 2}_1
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨  p_117 ∨ -b^{117, 2}_0
c  in DIMACS:
-19943  19944 -19945  117  19946 0
-19943  19944 -19945  117  19947 0
-19943  19944 -19945  117 -19948 0

c  -2-1 --> break 
c    ( b^{117, 1}_2 ∧  b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧ -p_117) -> break
c  in CNF:
c    -b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨  b^{117, 1}_0 ∨  p_117 ∨ break
c  in DIMACS:
-19943 -19944  19945  117 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 1}_2 ∧ -b^{117, 1}_1 ∧ -b^{117, 1}_0 ∧ true) 
c  in CNF:
c    -b^{117, 1}_2 ∨  b^{117, 1}_1 ∨  b^{117, 1}_0 ∨ false 
c  in DIMACS:
-19943  19944  19945  0

c  3 does not represent an automaton state.
c    -(-b^{117, 1}_2 ∧  b^{117, 1}_1 ∧  b^{117, 1}_0 ∧ true) 
c  in CNF:
c     b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ false 
c  in DIMACS:
 19943 -19944 -19945  0
c  -3 does not represent an automaton state.
c    -( b^{117, 1}_2 ∧  b^{117, 1}_1 ∧  b^{117, 1}_0 ∧ true) 
c  in CNF:
c    -b^{117, 1}_2 ∨ -b^{117, 1}_1 ∨ -b^{117, 1}_0 ∨ false 
c  in DIMACS:
-19943 -19944 -19945  0

c i = 2
c  -2+1 --> -1
c    ( b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧  p_234) -> ( b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0)
c  in CNF:
c    -b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨  b^{117, 3}_2
c    -b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_1
c    -b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨  b^{117, 3}_0
c  in DIMACS:
-19946 -19947  19948 -234  19949 0
-19946 -19947  19948 -234 -19950 0
-19946 -19947  19948 -234  19951 0

c  -1+1 --> 0
c    ( b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0 ∧  p_234) -> (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧ -b^{117, 3}_0)
c  in CNF:
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_2
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_1
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_0
c  in DIMACS:
-19946  19947 -19948 -234 -19949 0
-19946  19947 -19948 -234 -19950 0
-19946  19947 -19948 -234 -19951 0

c  0+1 --> 1
c    (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧  p_234) -> (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0)
c  in CNF:
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_2
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_1
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨  b^{117, 3}_0
c  in DIMACS:
 19946  19947  19948 -234 -19949 0
 19946  19947  19948 -234 -19950 0
 19946  19947  19948 -234  19951 0

c  1+1 --> 2
c    (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0 ∧  p_234) -> (-b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0)
c  in CNF:
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_2
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨  b^{117, 3}_1
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ -p_234 ∨ -b^{117, 3}_0
c  in DIMACS:
 19946  19947 -19948 -234 -19949 0
 19946  19947 -19948 -234  19950 0
 19946  19947 -19948 -234 -19951 0

c  2+1 --> break 
c    (-b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧  p_234) -> break
c  in CNF:
c     b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 19946 -19947  19948 -234 1162 0


c  2-1 --> 1
c    (-b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧ -p_234) -> (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0)
c  in CNF:
c     b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_2
c     b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_1
c     b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨  b^{117, 3}_0
c  in DIMACS:
 19946 -19947  19948  234 -19949 0
 19946 -19947  19948  234 -19950 0
 19946 -19947  19948  234  19951 0

c  1-1 --> 0
c    (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0 ∧ -p_234) -> (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧ -b^{117, 3}_0)
c  in CNF:
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_2
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_1
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_0
c  in DIMACS:
 19946  19947 -19948  234 -19949 0
 19946  19947 -19948  234 -19950 0
 19946  19947 -19948  234 -19951 0

c  0-1 --> -1
c    (-b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧ -p_234) -> ( b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0)
c  in CNF:
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨  b^{117, 3}_2
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_1
c     b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨  b^{117, 3}_0
c  in DIMACS:
 19946  19947  19948  234  19949 0
 19946  19947  19948  234 -19950 0
 19946  19947  19948  234  19951 0

c  -1-1 --> -2
c    ( b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧  b^{117, 2}_0 ∧ -p_234) -> ( b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0)
c  in CNF:
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨  b^{117, 3}_2
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨  b^{117, 3}_1
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨  p_234 ∨ -b^{117, 3}_0
c  in DIMACS:
-19946  19947 -19948  234  19949 0
-19946  19947 -19948  234  19950 0
-19946  19947 -19948  234 -19951 0

c  -2-1 --> break 
c    ( b^{117, 2}_2 ∧  b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨  b^{117, 2}_0 ∨  p_234 ∨ break
c  in DIMACS:
-19946 -19947  19948  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 2}_2 ∧ -b^{117, 2}_1 ∧ -b^{117, 2}_0 ∧ true) 
c  in CNF:
c    -b^{117, 2}_2 ∨  b^{117, 2}_1 ∨  b^{117, 2}_0 ∨ false 
c  in DIMACS:
-19946  19947  19948  0

c  3 does not represent an automaton state.
c    -(-b^{117, 2}_2 ∧  b^{117, 2}_1 ∧  b^{117, 2}_0 ∧ true) 
c  in CNF:
c     b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ false 
c  in DIMACS:
 19946 -19947 -19948  0
c  -3 does not represent an automaton state.
c    -( b^{117, 2}_2 ∧  b^{117, 2}_1 ∧  b^{117, 2}_0 ∧ true) 
c  in CNF:
c    -b^{117, 2}_2 ∨ -b^{117, 2}_1 ∨ -b^{117, 2}_0 ∨ false 
c  in DIMACS:
-19946 -19947 -19948  0

c i = 3
c  -2+1 --> -1
c    ( b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧  p_351) -> ( b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0)
c  in CNF:
c    -b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨  b^{117, 4}_2
c    -b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_1
c    -b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨  b^{117, 4}_0
c  in DIMACS:
-19949 -19950  19951 -351  19952 0
-19949 -19950  19951 -351 -19953 0
-19949 -19950  19951 -351  19954 0

c  -1+1 --> 0
c    ( b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0 ∧  p_351) -> (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧ -b^{117, 4}_0)
c  in CNF:
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_2
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_1
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_0
c  in DIMACS:
-19949  19950 -19951 -351 -19952 0
-19949  19950 -19951 -351 -19953 0
-19949  19950 -19951 -351 -19954 0

c  0+1 --> 1
c    (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧  p_351) -> (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0)
c  in CNF:
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_2
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_1
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨  b^{117, 4}_0
c  in DIMACS:
 19949  19950  19951 -351 -19952 0
 19949  19950  19951 -351 -19953 0
 19949  19950  19951 -351  19954 0

c  1+1 --> 2
c    (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0 ∧  p_351) -> (-b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0)
c  in CNF:
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_2
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨  b^{117, 4}_1
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ -p_351 ∨ -b^{117, 4}_0
c  in DIMACS:
 19949  19950 -19951 -351 -19952 0
 19949  19950 -19951 -351  19953 0
 19949  19950 -19951 -351 -19954 0

c  2+1 --> break 
c    (-b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧  p_351) -> break
c  in CNF:
c     b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 19949 -19950  19951 -351 1162 0


c  2-1 --> 1
c    (-b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧ -p_351) -> (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0)
c  in CNF:
c     b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_2
c     b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_1
c     b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨  b^{117, 4}_0
c  in DIMACS:
 19949 -19950  19951  351 -19952 0
 19949 -19950  19951  351 -19953 0
 19949 -19950  19951  351  19954 0

c  1-1 --> 0
c    (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0 ∧ -p_351) -> (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧ -b^{117, 4}_0)
c  in CNF:
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_2
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_1
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_0
c  in DIMACS:
 19949  19950 -19951  351 -19952 0
 19949  19950 -19951  351 -19953 0
 19949  19950 -19951  351 -19954 0

c  0-1 --> -1
c    (-b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧ -p_351) -> ( b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0)
c  in CNF:
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨  b^{117, 4}_2
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_1
c     b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨  b^{117, 4}_0
c  in DIMACS:
 19949  19950  19951  351  19952 0
 19949  19950  19951  351 -19953 0
 19949  19950  19951  351  19954 0

c  -1-1 --> -2
c    ( b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧  b^{117, 3}_0 ∧ -p_351) -> ( b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0)
c  in CNF:
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨  b^{117, 4}_2
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨  b^{117, 4}_1
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨  p_351 ∨ -b^{117, 4}_0
c  in DIMACS:
-19949  19950 -19951  351  19952 0
-19949  19950 -19951  351  19953 0
-19949  19950 -19951  351 -19954 0

c  -2-1 --> break 
c    ( b^{117, 3}_2 ∧  b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨  b^{117, 3}_0 ∨  p_351 ∨ break
c  in DIMACS:
-19949 -19950  19951  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 3}_2 ∧ -b^{117, 3}_1 ∧ -b^{117, 3}_0 ∧ true) 
c  in CNF:
c    -b^{117, 3}_2 ∨  b^{117, 3}_1 ∨  b^{117, 3}_0 ∨ false 
c  in DIMACS:
-19949  19950  19951  0

c  3 does not represent an automaton state.
c    -(-b^{117, 3}_2 ∧  b^{117, 3}_1 ∧  b^{117, 3}_0 ∧ true) 
c  in CNF:
c     b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ false 
c  in DIMACS:
 19949 -19950 -19951  0
c  -3 does not represent an automaton state.
c    -( b^{117, 3}_2 ∧  b^{117, 3}_1 ∧  b^{117, 3}_0 ∧ true) 
c  in CNF:
c    -b^{117, 3}_2 ∨ -b^{117, 3}_1 ∨ -b^{117, 3}_0 ∨ false 
c  in DIMACS:
-19949 -19950 -19951  0

c i = 4
c  -2+1 --> -1
c    ( b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧  p_468) -> ( b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0)
c  in CNF:
c    -b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨  b^{117, 5}_2
c    -b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_1
c    -b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨  b^{117, 5}_0
c  in DIMACS:
-19952 -19953  19954 -468  19955 0
-19952 -19953  19954 -468 -19956 0
-19952 -19953  19954 -468  19957 0

c  -1+1 --> 0
c    ( b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0 ∧  p_468) -> (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧ -b^{117, 5}_0)
c  in CNF:
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_2
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_1
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_0
c  in DIMACS:
-19952  19953 -19954 -468 -19955 0
-19952  19953 -19954 -468 -19956 0
-19952  19953 -19954 -468 -19957 0

c  0+1 --> 1
c    (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧  p_468) -> (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0)
c  in CNF:
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_2
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_1
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨  b^{117, 5}_0
c  in DIMACS:
 19952  19953  19954 -468 -19955 0
 19952  19953  19954 -468 -19956 0
 19952  19953  19954 -468  19957 0

c  1+1 --> 2
c    (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0 ∧  p_468) -> (-b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0)
c  in CNF:
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_2
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨  b^{117, 5}_1
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ -p_468 ∨ -b^{117, 5}_0
c  in DIMACS:
 19952  19953 -19954 -468 -19955 0
 19952  19953 -19954 -468  19956 0
 19952  19953 -19954 -468 -19957 0

c  2+1 --> break 
c    (-b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧  p_468) -> break
c  in CNF:
c     b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 19952 -19953  19954 -468 1162 0


c  2-1 --> 1
c    (-b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧ -p_468) -> (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0)
c  in CNF:
c     b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_2
c     b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_1
c     b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨  b^{117, 5}_0
c  in DIMACS:
 19952 -19953  19954  468 -19955 0
 19952 -19953  19954  468 -19956 0
 19952 -19953  19954  468  19957 0

c  1-1 --> 0
c    (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0 ∧ -p_468) -> (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧ -b^{117, 5}_0)
c  in CNF:
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_2
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_1
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_0
c  in DIMACS:
 19952  19953 -19954  468 -19955 0
 19952  19953 -19954  468 -19956 0
 19952  19953 -19954  468 -19957 0

c  0-1 --> -1
c    (-b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧ -p_468) -> ( b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0)
c  in CNF:
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨  b^{117, 5}_2
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_1
c     b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨  b^{117, 5}_0
c  in DIMACS:
 19952  19953  19954  468  19955 0
 19952  19953  19954  468 -19956 0
 19952  19953  19954  468  19957 0

c  -1-1 --> -2
c    ( b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧  b^{117, 4}_0 ∧ -p_468) -> ( b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0)
c  in CNF:
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨  b^{117, 5}_2
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨  b^{117, 5}_1
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨  p_468 ∨ -b^{117, 5}_0
c  in DIMACS:
-19952  19953 -19954  468  19955 0
-19952  19953 -19954  468  19956 0
-19952  19953 -19954  468 -19957 0

c  -2-1 --> break 
c    ( b^{117, 4}_2 ∧  b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨  b^{117, 4}_0 ∨  p_468 ∨ break
c  in DIMACS:
-19952 -19953  19954  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 4}_2 ∧ -b^{117, 4}_1 ∧ -b^{117, 4}_0 ∧ true) 
c  in CNF:
c    -b^{117, 4}_2 ∨  b^{117, 4}_1 ∨  b^{117, 4}_0 ∨ false 
c  in DIMACS:
-19952  19953  19954  0

c  3 does not represent an automaton state.
c    -(-b^{117, 4}_2 ∧  b^{117, 4}_1 ∧  b^{117, 4}_0 ∧ true) 
c  in CNF:
c     b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ false 
c  in DIMACS:
 19952 -19953 -19954  0
c  -3 does not represent an automaton state.
c    -( b^{117, 4}_2 ∧  b^{117, 4}_1 ∧  b^{117, 4}_0 ∧ true) 
c  in CNF:
c    -b^{117, 4}_2 ∨ -b^{117, 4}_1 ∨ -b^{117, 4}_0 ∨ false 
c  in DIMACS:
-19952 -19953 -19954  0

c i = 5
c  -2+1 --> -1
c    ( b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧  p_585) -> ( b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0)
c  in CNF:
c    -b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨  b^{117, 6}_2
c    -b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_1
c    -b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨  b^{117, 6}_0
c  in DIMACS:
-19955 -19956  19957 -585  19958 0
-19955 -19956  19957 -585 -19959 0
-19955 -19956  19957 -585  19960 0

c  -1+1 --> 0
c    ( b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0 ∧  p_585) -> (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧ -b^{117, 6}_0)
c  in CNF:
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_2
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_1
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_0
c  in DIMACS:
-19955  19956 -19957 -585 -19958 0
-19955  19956 -19957 -585 -19959 0
-19955  19956 -19957 -585 -19960 0

c  0+1 --> 1
c    (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧  p_585) -> (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0)
c  in CNF:
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_2
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_1
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨  b^{117, 6}_0
c  in DIMACS:
 19955  19956  19957 -585 -19958 0
 19955  19956  19957 -585 -19959 0
 19955  19956  19957 -585  19960 0

c  1+1 --> 2
c    (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0 ∧  p_585) -> (-b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0)
c  in CNF:
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_2
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨  b^{117, 6}_1
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ -p_585 ∨ -b^{117, 6}_0
c  in DIMACS:
 19955  19956 -19957 -585 -19958 0
 19955  19956 -19957 -585  19959 0
 19955  19956 -19957 -585 -19960 0

c  2+1 --> break 
c    (-b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧  p_585) -> break
c  in CNF:
c     b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 19955 -19956  19957 -585 1162 0


c  2-1 --> 1
c    (-b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧ -p_585) -> (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0)
c  in CNF:
c     b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_2
c     b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_1
c     b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨  b^{117, 6}_0
c  in DIMACS:
 19955 -19956  19957  585 -19958 0
 19955 -19956  19957  585 -19959 0
 19955 -19956  19957  585  19960 0

c  1-1 --> 0
c    (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0 ∧ -p_585) -> (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧ -b^{117, 6}_0)
c  in CNF:
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_2
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_1
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_0
c  in DIMACS:
 19955  19956 -19957  585 -19958 0
 19955  19956 -19957  585 -19959 0
 19955  19956 -19957  585 -19960 0

c  0-1 --> -1
c    (-b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧ -p_585) -> ( b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0)
c  in CNF:
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨  b^{117, 6}_2
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_1
c     b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨  b^{117, 6}_0
c  in DIMACS:
 19955  19956  19957  585  19958 0
 19955  19956  19957  585 -19959 0
 19955  19956  19957  585  19960 0

c  -1-1 --> -2
c    ( b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧  b^{117, 5}_0 ∧ -p_585) -> ( b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0)
c  in CNF:
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨  b^{117, 6}_2
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨  b^{117, 6}_1
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨  p_585 ∨ -b^{117, 6}_0
c  in DIMACS:
-19955  19956 -19957  585  19958 0
-19955  19956 -19957  585  19959 0
-19955  19956 -19957  585 -19960 0

c  -2-1 --> break 
c    ( b^{117, 5}_2 ∧  b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨  b^{117, 5}_0 ∨  p_585 ∨ break
c  in DIMACS:
-19955 -19956  19957  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 5}_2 ∧ -b^{117, 5}_1 ∧ -b^{117, 5}_0 ∧ true) 
c  in CNF:
c    -b^{117, 5}_2 ∨  b^{117, 5}_1 ∨  b^{117, 5}_0 ∨ false 
c  in DIMACS:
-19955  19956  19957  0

c  3 does not represent an automaton state.
c    -(-b^{117, 5}_2 ∧  b^{117, 5}_1 ∧  b^{117, 5}_0 ∧ true) 
c  in CNF:
c     b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ false 
c  in DIMACS:
 19955 -19956 -19957  0
c  -3 does not represent an automaton state.
c    -( b^{117, 5}_2 ∧  b^{117, 5}_1 ∧  b^{117, 5}_0 ∧ true) 
c  in CNF:
c    -b^{117, 5}_2 ∨ -b^{117, 5}_1 ∨ -b^{117, 5}_0 ∨ false 
c  in DIMACS:
-19955 -19956 -19957  0

c i = 6
c  -2+1 --> -1
c    ( b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧  p_702) -> ( b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0)
c  in CNF:
c    -b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨  b^{117, 7}_2
c    -b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_1
c    -b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨  b^{117, 7}_0
c  in DIMACS:
-19958 -19959  19960 -702  19961 0
-19958 -19959  19960 -702 -19962 0
-19958 -19959  19960 -702  19963 0

c  -1+1 --> 0
c    ( b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0 ∧  p_702) -> (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧ -b^{117, 7}_0)
c  in CNF:
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_2
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_1
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_0
c  in DIMACS:
-19958  19959 -19960 -702 -19961 0
-19958  19959 -19960 -702 -19962 0
-19958  19959 -19960 -702 -19963 0

c  0+1 --> 1
c    (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧  p_702) -> (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0)
c  in CNF:
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_2
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_1
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨  b^{117, 7}_0
c  in DIMACS:
 19958  19959  19960 -702 -19961 0
 19958  19959  19960 -702 -19962 0
 19958  19959  19960 -702  19963 0

c  1+1 --> 2
c    (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0 ∧  p_702) -> (-b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0)
c  in CNF:
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_2
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨  b^{117, 7}_1
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ -p_702 ∨ -b^{117, 7}_0
c  in DIMACS:
 19958  19959 -19960 -702 -19961 0
 19958  19959 -19960 -702  19962 0
 19958  19959 -19960 -702 -19963 0

c  2+1 --> break 
c    (-b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧  p_702) -> break
c  in CNF:
c     b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 19958 -19959  19960 -702 1162 0


c  2-1 --> 1
c    (-b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧ -p_702) -> (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0)
c  in CNF:
c     b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_2
c     b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_1
c     b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨  b^{117, 7}_0
c  in DIMACS:
 19958 -19959  19960  702 -19961 0
 19958 -19959  19960  702 -19962 0
 19958 -19959  19960  702  19963 0

c  1-1 --> 0
c    (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0 ∧ -p_702) -> (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧ -b^{117, 7}_0)
c  in CNF:
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_2
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_1
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_0
c  in DIMACS:
 19958  19959 -19960  702 -19961 0
 19958  19959 -19960  702 -19962 0
 19958  19959 -19960  702 -19963 0

c  0-1 --> -1
c    (-b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧ -p_702) -> ( b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0)
c  in CNF:
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨  b^{117, 7}_2
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_1
c     b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨  b^{117, 7}_0
c  in DIMACS:
 19958  19959  19960  702  19961 0
 19958  19959  19960  702 -19962 0
 19958  19959  19960  702  19963 0

c  -1-1 --> -2
c    ( b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧  b^{117, 6}_0 ∧ -p_702) -> ( b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0)
c  in CNF:
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨  b^{117, 7}_2
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨  b^{117, 7}_1
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨  p_702 ∨ -b^{117, 7}_0
c  in DIMACS:
-19958  19959 -19960  702  19961 0
-19958  19959 -19960  702  19962 0
-19958  19959 -19960  702 -19963 0

c  -2-1 --> break 
c    ( b^{117, 6}_2 ∧  b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨  b^{117, 6}_0 ∨  p_702 ∨ break
c  in DIMACS:
-19958 -19959  19960  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 6}_2 ∧ -b^{117, 6}_1 ∧ -b^{117, 6}_0 ∧ true) 
c  in CNF:
c    -b^{117, 6}_2 ∨  b^{117, 6}_1 ∨  b^{117, 6}_0 ∨ false 
c  in DIMACS:
-19958  19959  19960  0

c  3 does not represent an automaton state.
c    -(-b^{117, 6}_2 ∧  b^{117, 6}_1 ∧  b^{117, 6}_0 ∧ true) 
c  in CNF:
c     b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ false 
c  in DIMACS:
 19958 -19959 -19960  0
c  -3 does not represent an automaton state.
c    -( b^{117, 6}_2 ∧  b^{117, 6}_1 ∧  b^{117, 6}_0 ∧ true) 
c  in CNF:
c    -b^{117, 6}_2 ∨ -b^{117, 6}_1 ∨ -b^{117, 6}_0 ∨ false 
c  in DIMACS:
-19958 -19959 -19960  0

c i = 7
c  -2+1 --> -1
c    ( b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧  p_819) -> ( b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0)
c  in CNF:
c    -b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨  b^{117, 8}_2
c    -b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_1
c    -b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨  b^{117, 8}_0
c  in DIMACS:
-19961 -19962  19963 -819  19964 0
-19961 -19962  19963 -819 -19965 0
-19961 -19962  19963 -819  19966 0

c  -1+1 --> 0
c    ( b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0 ∧  p_819) -> (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧ -b^{117, 8}_0)
c  in CNF:
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_2
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_1
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_0
c  in DIMACS:
-19961  19962 -19963 -819 -19964 0
-19961  19962 -19963 -819 -19965 0
-19961  19962 -19963 -819 -19966 0

c  0+1 --> 1
c    (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧  p_819) -> (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0)
c  in CNF:
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_2
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_1
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨  b^{117, 8}_0
c  in DIMACS:
 19961  19962  19963 -819 -19964 0
 19961  19962  19963 -819 -19965 0
 19961  19962  19963 -819  19966 0

c  1+1 --> 2
c    (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0 ∧  p_819) -> (-b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0)
c  in CNF:
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_2
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨  b^{117, 8}_1
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ -p_819 ∨ -b^{117, 8}_0
c  in DIMACS:
 19961  19962 -19963 -819 -19964 0
 19961  19962 -19963 -819  19965 0
 19961  19962 -19963 -819 -19966 0

c  2+1 --> break 
c    (-b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧  p_819) -> break
c  in CNF:
c     b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 19961 -19962  19963 -819 1162 0


c  2-1 --> 1
c    (-b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧ -p_819) -> (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0)
c  in CNF:
c     b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_2
c     b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_1
c     b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨  b^{117, 8}_0
c  in DIMACS:
 19961 -19962  19963  819 -19964 0
 19961 -19962  19963  819 -19965 0
 19961 -19962  19963  819  19966 0

c  1-1 --> 0
c    (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0 ∧ -p_819) -> (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧ -b^{117, 8}_0)
c  in CNF:
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_2
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_1
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_0
c  in DIMACS:
 19961  19962 -19963  819 -19964 0
 19961  19962 -19963  819 -19965 0
 19961  19962 -19963  819 -19966 0

c  0-1 --> -1
c    (-b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧ -p_819) -> ( b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0)
c  in CNF:
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨  b^{117, 8}_2
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_1
c     b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨  b^{117, 8}_0
c  in DIMACS:
 19961  19962  19963  819  19964 0
 19961  19962  19963  819 -19965 0
 19961  19962  19963  819  19966 0

c  -1-1 --> -2
c    ( b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧  b^{117, 7}_0 ∧ -p_819) -> ( b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0)
c  in CNF:
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨  b^{117, 8}_2
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨  b^{117, 8}_1
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨  p_819 ∨ -b^{117, 8}_0
c  in DIMACS:
-19961  19962 -19963  819  19964 0
-19961  19962 -19963  819  19965 0
-19961  19962 -19963  819 -19966 0

c  -2-1 --> break 
c    ( b^{117, 7}_2 ∧  b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨  b^{117, 7}_0 ∨  p_819 ∨ break
c  in DIMACS:
-19961 -19962  19963  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 7}_2 ∧ -b^{117, 7}_1 ∧ -b^{117, 7}_0 ∧ true) 
c  in CNF:
c    -b^{117, 7}_2 ∨  b^{117, 7}_1 ∨  b^{117, 7}_0 ∨ false 
c  in DIMACS:
-19961  19962  19963  0

c  3 does not represent an automaton state.
c    -(-b^{117, 7}_2 ∧  b^{117, 7}_1 ∧  b^{117, 7}_0 ∧ true) 
c  in CNF:
c     b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ false 
c  in DIMACS:
 19961 -19962 -19963  0
c  -3 does not represent an automaton state.
c    -( b^{117, 7}_2 ∧  b^{117, 7}_1 ∧  b^{117, 7}_0 ∧ true) 
c  in CNF:
c    -b^{117, 7}_2 ∨ -b^{117, 7}_1 ∨ -b^{117, 7}_0 ∨ false 
c  in DIMACS:
-19961 -19962 -19963  0

c i = 8
c  -2+1 --> -1
c    ( b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧  p_936) -> ( b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0)
c  in CNF:
c    -b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨  b^{117, 9}_2
c    -b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_1
c    -b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨  b^{117, 9}_0
c  in DIMACS:
-19964 -19965  19966 -936  19967 0
-19964 -19965  19966 -936 -19968 0
-19964 -19965  19966 -936  19969 0

c  -1+1 --> 0
c    ( b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0 ∧  p_936) -> (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧ -b^{117, 9}_0)
c  in CNF:
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_2
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_1
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_0
c  in DIMACS:
-19964  19965 -19966 -936 -19967 0
-19964  19965 -19966 -936 -19968 0
-19964  19965 -19966 -936 -19969 0

c  0+1 --> 1
c    (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧  p_936) -> (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0)
c  in CNF:
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_2
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_1
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨  b^{117, 9}_0
c  in DIMACS:
 19964  19965  19966 -936 -19967 0
 19964  19965  19966 -936 -19968 0
 19964  19965  19966 -936  19969 0

c  1+1 --> 2
c    (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0 ∧  p_936) -> (-b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0)
c  in CNF:
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_2
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨  b^{117, 9}_1
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ -p_936 ∨ -b^{117, 9}_0
c  in DIMACS:
 19964  19965 -19966 -936 -19967 0
 19964  19965 -19966 -936  19968 0
 19964  19965 -19966 -936 -19969 0

c  2+1 --> break 
c    (-b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧  p_936) -> break
c  in CNF:
c     b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 19964 -19965  19966 -936 1162 0


c  2-1 --> 1
c    (-b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧ -p_936) -> (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0)
c  in CNF:
c     b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_2
c     b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_1
c     b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨  b^{117, 9}_0
c  in DIMACS:
 19964 -19965  19966  936 -19967 0
 19964 -19965  19966  936 -19968 0
 19964 -19965  19966  936  19969 0

c  1-1 --> 0
c    (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0 ∧ -p_936) -> (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧ -b^{117, 9}_0)
c  in CNF:
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_2
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_1
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_0
c  in DIMACS:
 19964  19965 -19966  936 -19967 0
 19964  19965 -19966  936 -19968 0
 19964  19965 -19966  936 -19969 0

c  0-1 --> -1
c    (-b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧ -p_936) -> ( b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0)
c  in CNF:
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨  b^{117, 9}_2
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_1
c     b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨  b^{117, 9}_0
c  in DIMACS:
 19964  19965  19966  936  19967 0
 19964  19965  19966  936 -19968 0
 19964  19965  19966  936  19969 0

c  -1-1 --> -2
c    ( b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧  b^{117, 8}_0 ∧ -p_936) -> ( b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0)
c  in CNF:
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨  b^{117, 9}_2
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨  b^{117, 9}_1
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨  p_936 ∨ -b^{117, 9}_0
c  in DIMACS:
-19964  19965 -19966  936  19967 0
-19964  19965 -19966  936  19968 0
-19964  19965 -19966  936 -19969 0

c  -2-1 --> break 
c    ( b^{117, 8}_2 ∧  b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨  b^{117, 8}_0 ∨  p_936 ∨ break
c  in DIMACS:
-19964 -19965  19966  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 8}_2 ∧ -b^{117, 8}_1 ∧ -b^{117, 8}_0 ∧ true) 
c  in CNF:
c    -b^{117, 8}_2 ∨  b^{117, 8}_1 ∨  b^{117, 8}_0 ∨ false 
c  in DIMACS:
-19964  19965  19966  0

c  3 does not represent an automaton state.
c    -(-b^{117, 8}_2 ∧  b^{117, 8}_1 ∧  b^{117, 8}_0 ∧ true) 
c  in CNF:
c     b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ false 
c  in DIMACS:
 19964 -19965 -19966  0
c  -3 does not represent an automaton state.
c    -( b^{117, 8}_2 ∧  b^{117, 8}_1 ∧  b^{117, 8}_0 ∧ true) 
c  in CNF:
c    -b^{117, 8}_2 ∨ -b^{117, 8}_1 ∨ -b^{117, 8}_0 ∨ false 
c  in DIMACS:
-19964 -19965 -19966  0

c i = 9
c  -2+1 --> -1
c    ( b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧  p_1053) -> ( b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧  b^{117, 10}_0)
c  in CNF:
c    -b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨  b^{117, 10}_2
c    -b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_1
c    -b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨  b^{117, 10}_0
c  in DIMACS:
-19967 -19968  19969 -1053  19970 0
-19967 -19968  19969 -1053 -19971 0
-19967 -19968  19969 -1053  19972 0

c  -1+1 --> 0
c    ( b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0 ∧  p_1053) -> (-b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧ -b^{117, 10}_0)
c  in CNF:
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_2
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_1
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_0
c  in DIMACS:
-19967  19968 -19969 -1053 -19970 0
-19967  19968 -19969 -1053 -19971 0
-19967  19968 -19969 -1053 -19972 0

c  0+1 --> 1
c    (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧  p_1053) -> (-b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧  b^{117, 10}_0)
c  in CNF:
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_2
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_1
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨  b^{117, 10}_0
c  in DIMACS:
 19967  19968  19969 -1053 -19970 0
 19967  19968  19969 -1053 -19971 0
 19967  19968  19969 -1053  19972 0

c  1+1 --> 2
c    (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0 ∧  p_1053) -> (-b^{117, 10}_2 ∧  b^{117, 10}_1 ∧ -b^{117, 10}_0)
c  in CNF:
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_2
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨  b^{117, 10}_1
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ -p_1053 ∨ -b^{117, 10}_0
c  in DIMACS:
 19967  19968 -19969 -1053 -19970 0
 19967  19968 -19969 -1053  19971 0
 19967  19968 -19969 -1053 -19972 0

c  2+1 --> break 
c    (-b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 19967 -19968  19969 -1053 1162 0


c  2-1 --> 1
c    (-b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧ -p_1053) -> (-b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧  b^{117, 10}_0)
c  in CNF:
c     b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_2
c     b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_1
c     b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨  b^{117, 10}_0
c  in DIMACS:
 19967 -19968  19969  1053 -19970 0
 19967 -19968  19969  1053 -19971 0
 19967 -19968  19969  1053  19972 0

c  1-1 --> 0
c    (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0 ∧ -p_1053) -> (-b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧ -b^{117, 10}_0)
c  in CNF:
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_2
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_1
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_0
c  in DIMACS:
 19967  19968 -19969  1053 -19970 0
 19967  19968 -19969  1053 -19971 0
 19967  19968 -19969  1053 -19972 0

c  0-1 --> -1
c    (-b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧ -p_1053) -> ( b^{117, 10}_2 ∧ -b^{117, 10}_1 ∧  b^{117, 10}_0)
c  in CNF:
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨  b^{117, 10}_2
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_1
c     b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨  b^{117, 10}_0
c  in DIMACS:
 19967  19968  19969  1053  19970 0
 19967  19968  19969  1053 -19971 0
 19967  19968  19969  1053  19972 0

c  -1-1 --> -2
c    ( b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧  b^{117, 9}_0 ∧ -p_1053) -> ( b^{117, 10}_2 ∧  b^{117, 10}_1 ∧ -b^{117, 10}_0)
c  in CNF:
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨  b^{117, 10}_2
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨  b^{117, 10}_1
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨  p_1053 ∨ -b^{117, 10}_0
c  in DIMACS:
-19967  19968 -19969  1053  19970 0
-19967  19968 -19969  1053  19971 0
-19967  19968 -19969  1053 -19972 0

c  -2-1 --> break 
c    ( b^{117, 9}_2 ∧  b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨  b^{117, 9}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-19967 -19968  19969  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{117, 9}_2 ∧ -b^{117, 9}_1 ∧ -b^{117, 9}_0 ∧ true) 
c  in CNF:
c    -b^{117, 9}_2 ∨  b^{117, 9}_1 ∨  b^{117, 9}_0 ∨ false 
c  in DIMACS:
-19967  19968  19969  0

c  3 does not represent an automaton state.
c    -(-b^{117, 9}_2 ∧  b^{117, 9}_1 ∧  b^{117, 9}_0 ∧ true) 
c  in CNF:
c     b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ false 
c  in DIMACS:
 19967 -19968 -19969  0
c  -3 does not represent an automaton state.
c    -( b^{117, 9}_2 ∧  b^{117, 9}_1 ∧  b^{117, 9}_0 ∧ true) 
c  in CNF:
c    -b^{117, 9}_2 ∨ -b^{117, 9}_1 ∨ -b^{117, 9}_0 ∨ false 
c  in DIMACS:
-19967 -19968 -19969  0

c INIT for k = 118
c    -b^{118, 1}_2
c    -b^{118, 1}_1
c    -b^{118, 1}_0
c  in DIMACS:
-19973 0
-19974 0
-19975 0

c Transitions for k = 118
c i = 1
c  -2+1 --> -1
c    ( b^{118, 1}_2 ∧  b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧  p_118) -> ( b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0)
c  in CNF:
c    -b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨  b^{118, 2}_2
c    -b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_1
c    -b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨  b^{118, 2}_0
c  in DIMACS:
-19973 -19974  19975 -118  19976 0
-19973 -19974  19975 -118 -19977 0
-19973 -19974  19975 -118  19978 0

c  -1+1 --> 0
c    ( b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧  b^{118, 1}_0 ∧  p_118) -> (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧ -b^{118, 2}_0)
c  in CNF:
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_2
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_1
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_0
c  in DIMACS:
-19973  19974 -19975 -118 -19976 0
-19973  19974 -19975 -118 -19977 0
-19973  19974 -19975 -118 -19978 0

c  0+1 --> 1
c    (-b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧  p_118) -> (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0)
c  in CNF:
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_2
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_1
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨  b^{118, 2}_0
c  in DIMACS:
 19973  19974  19975 -118 -19976 0
 19973  19974  19975 -118 -19977 0
 19973  19974  19975 -118  19978 0

c  1+1 --> 2
c    (-b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧  b^{118, 1}_0 ∧  p_118) -> (-b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0)
c  in CNF:
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_2
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨  b^{118, 2}_1
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ -p_118 ∨ -b^{118, 2}_0
c  in DIMACS:
 19973  19974 -19975 -118 -19976 0
 19973  19974 -19975 -118  19977 0
 19973  19974 -19975 -118 -19978 0

c  2+1 --> break 
c    (-b^{118, 1}_2 ∧  b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧  p_118) -> break
c  in CNF:
c     b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ -p_118 ∨ break
c  in DIMACS:
 19973 -19974  19975 -118 1162 0


c  2-1 --> 1
c    (-b^{118, 1}_2 ∧  b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧ -p_118) -> (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0)
c  in CNF:
c     b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_2
c     b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_1
c     b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨  b^{118, 2}_0
c  in DIMACS:
 19973 -19974  19975  118 -19976 0
 19973 -19974  19975  118 -19977 0
 19973 -19974  19975  118  19978 0

c  1-1 --> 0
c    (-b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧  b^{118, 1}_0 ∧ -p_118) -> (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧ -b^{118, 2}_0)
c  in CNF:
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_2
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_1
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_0
c  in DIMACS:
 19973  19974 -19975  118 -19976 0
 19973  19974 -19975  118 -19977 0
 19973  19974 -19975  118 -19978 0

c  0-1 --> -1
c    (-b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧ -p_118) -> ( b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0)
c  in CNF:
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨  b^{118, 2}_2
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_1
c     b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨  b^{118, 2}_0
c  in DIMACS:
 19973  19974  19975  118  19976 0
 19973  19974  19975  118 -19977 0
 19973  19974  19975  118  19978 0

c  -1-1 --> -2
c    ( b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧  b^{118, 1}_0 ∧ -p_118) -> ( b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0)
c  in CNF:
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨  b^{118, 2}_2
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨  b^{118, 2}_1
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨  p_118 ∨ -b^{118, 2}_0
c  in DIMACS:
-19973  19974 -19975  118  19976 0
-19973  19974 -19975  118  19977 0
-19973  19974 -19975  118 -19978 0

c  -2-1 --> break 
c    ( b^{118, 1}_2 ∧  b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧ -p_118) -> break
c  in CNF:
c    -b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨  b^{118, 1}_0 ∨  p_118 ∨ break
c  in DIMACS:
-19973 -19974  19975  118 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 1}_2 ∧ -b^{118, 1}_1 ∧ -b^{118, 1}_0 ∧ true) 
c  in CNF:
c    -b^{118, 1}_2 ∨  b^{118, 1}_1 ∨  b^{118, 1}_0 ∨ false 
c  in DIMACS:
-19973  19974  19975  0

c  3 does not represent an automaton state.
c    -(-b^{118, 1}_2 ∧  b^{118, 1}_1 ∧  b^{118, 1}_0 ∧ true) 
c  in CNF:
c     b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ false 
c  in DIMACS:
 19973 -19974 -19975  0
c  -3 does not represent an automaton state.
c    -( b^{118, 1}_2 ∧  b^{118, 1}_1 ∧  b^{118, 1}_0 ∧ true) 
c  in CNF:
c    -b^{118, 1}_2 ∨ -b^{118, 1}_1 ∨ -b^{118, 1}_0 ∨ false 
c  in DIMACS:
-19973 -19974 -19975  0

c i = 2
c  -2+1 --> -1
c    ( b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧  p_236) -> ( b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0)
c  in CNF:
c    -b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨  b^{118, 3}_2
c    -b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_1
c    -b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨  b^{118, 3}_0
c  in DIMACS:
-19976 -19977  19978 -236  19979 0
-19976 -19977  19978 -236 -19980 0
-19976 -19977  19978 -236  19981 0

c  -1+1 --> 0
c    ( b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0 ∧  p_236) -> (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧ -b^{118, 3}_0)
c  in CNF:
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_2
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_1
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_0
c  in DIMACS:
-19976  19977 -19978 -236 -19979 0
-19976  19977 -19978 -236 -19980 0
-19976  19977 -19978 -236 -19981 0

c  0+1 --> 1
c    (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧  p_236) -> (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0)
c  in CNF:
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_2
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_1
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨  b^{118, 3}_0
c  in DIMACS:
 19976  19977  19978 -236 -19979 0
 19976  19977  19978 -236 -19980 0
 19976  19977  19978 -236  19981 0

c  1+1 --> 2
c    (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0 ∧  p_236) -> (-b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0)
c  in CNF:
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_2
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨  b^{118, 3}_1
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ -p_236 ∨ -b^{118, 3}_0
c  in DIMACS:
 19976  19977 -19978 -236 -19979 0
 19976  19977 -19978 -236  19980 0
 19976  19977 -19978 -236 -19981 0

c  2+1 --> break 
c    (-b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧  p_236) -> break
c  in CNF:
c     b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 19976 -19977  19978 -236 1162 0


c  2-1 --> 1
c    (-b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧ -p_236) -> (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0)
c  in CNF:
c     b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_2
c     b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_1
c     b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨  b^{118, 3}_0
c  in DIMACS:
 19976 -19977  19978  236 -19979 0
 19976 -19977  19978  236 -19980 0
 19976 -19977  19978  236  19981 0

c  1-1 --> 0
c    (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0 ∧ -p_236) -> (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧ -b^{118, 3}_0)
c  in CNF:
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_2
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_1
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_0
c  in DIMACS:
 19976  19977 -19978  236 -19979 0
 19976  19977 -19978  236 -19980 0
 19976  19977 -19978  236 -19981 0

c  0-1 --> -1
c    (-b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧ -p_236) -> ( b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0)
c  in CNF:
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨  b^{118, 3}_2
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_1
c     b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨  b^{118, 3}_0
c  in DIMACS:
 19976  19977  19978  236  19979 0
 19976  19977  19978  236 -19980 0
 19976  19977  19978  236  19981 0

c  -1-1 --> -2
c    ( b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧  b^{118, 2}_0 ∧ -p_236) -> ( b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0)
c  in CNF:
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨  b^{118, 3}_2
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨  b^{118, 3}_1
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨  p_236 ∨ -b^{118, 3}_0
c  in DIMACS:
-19976  19977 -19978  236  19979 0
-19976  19977 -19978  236  19980 0
-19976  19977 -19978  236 -19981 0

c  -2-1 --> break 
c    ( b^{118, 2}_2 ∧  b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨  b^{118, 2}_0 ∨  p_236 ∨ break
c  in DIMACS:
-19976 -19977  19978  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 2}_2 ∧ -b^{118, 2}_1 ∧ -b^{118, 2}_0 ∧ true) 
c  in CNF:
c    -b^{118, 2}_2 ∨  b^{118, 2}_1 ∨  b^{118, 2}_0 ∨ false 
c  in DIMACS:
-19976  19977  19978  0

c  3 does not represent an automaton state.
c    -(-b^{118, 2}_2 ∧  b^{118, 2}_1 ∧  b^{118, 2}_0 ∧ true) 
c  in CNF:
c     b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ false 
c  in DIMACS:
 19976 -19977 -19978  0
c  -3 does not represent an automaton state.
c    -( b^{118, 2}_2 ∧  b^{118, 2}_1 ∧  b^{118, 2}_0 ∧ true) 
c  in CNF:
c    -b^{118, 2}_2 ∨ -b^{118, 2}_1 ∨ -b^{118, 2}_0 ∨ false 
c  in DIMACS:
-19976 -19977 -19978  0

c i = 3
c  -2+1 --> -1
c    ( b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧  p_354) -> ( b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0)
c  in CNF:
c    -b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨  b^{118, 4}_2
c    -b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_1
c    -b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨  b^{118, 4}_0
c  in DIMACS:
-19979 -19980  19981 -354  19982 0
-19979 -19980  19981 -354 -19983 0
-19979 -19980  19981 -354  19984 0

c  -1+1 --> 0
c    ( b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0 ∧  p_354) -> (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧ -b^{118, 4}_0)
c  in CNF:
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_2
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_1
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_0
c  in DIMACS:
-19979  19980 -19981 -354 -19982 0
-19979  19980 -19981 -354 -19983 0
-19979  19980 -19981 -354 -19984 0

c  0+1 --> 1
c    (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧  p_354) -> (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0)
c  in CNF:
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_2
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_1
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨  b^{118, 4}_0
c  in DIMACS:
 19979  19980  19981 -354 -19982 0
 19979  19980  19981 -354 -19983 0
 19979  19980  19981 -354  19984 0

c  1+1 --> 2
c    (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0 ∧  p_354) -> (-b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0)
c  in CNF:
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_2
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨  b^{118, 4}_1
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ -p_354 ∨ -b^{118, 4}_0
c  in DIMACS:
 19979  19980 -19981 -354 -19982 0
 19979  19980 -19981 -354  19983 0
 19979  19980 -19981 -354 -19984 0

c  2+1 --> break 
c    (-b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧  p_354) -> break
c  in CNF:
c     b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 19979 -19980  19981 -354 1162 0


c  2-1 --> 1
c    (-b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧ -p_354) -> (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0)
c  in CNF:
c     b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_2
c     b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_1
c     b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨  b^{118, 4}_0
c  in DIMACS:
 19979 -19980  19981  354 -19982 0
 19979 -19980  19981  354 -19983 0
 19979 -19980  19981  354  19984 0

c  1-1 --> 0
c    (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0 ∧ -p_354) -> (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧ -b^{118, 4}_0)
c  in CNF:
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_2
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_1
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_0
c  in DIMACS:
 19979  19980 -19981  354 -19982 0
 19979  19980 -19981  354 -19983 0
 19979  19980 -19981  354 -19984 0

c  0-1 --> -1
c    (-b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧ -p_354) -> ( b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0)
c  in CNF:
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨  b^{118, 4}_2
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_1
c     b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨  b^{118, 4}_0
c  in DIMACS:
 19979  19980  19981  354  19982 0
 19979  19980  19981  354 -19983 0
 19979  19980  19981  354  19984 0

c  -1-1 --> -2
c    ( b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧  b^{118, 3}_0 ∧ -p_354) -> ( b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0)
c  in CNF:
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨  b^{118, 4}_2
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨  b^{118, 4}_1
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨  p_354 ∨ -b^{118, 4}_0
c  in DIMACS:
-19979  19980 -19981  354  19982 0
-19979  19980 -19981  354  19983 0
-19979  19980 -19981  354 -19984 0

c  -2-1 --> break 
c    ( b^{118, 3}_2 ∧  b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨  b^{118, 3}_0 ∨  p_354 ∨ break
c  in DIMACS:
-19979 -19980  19981  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 3}_2 ∧ -b^{118, 3}_1 ∧ -b^{118, 3}_0 ∧ true) 
c  in CNF:
c    -b^{118, 3}_2 ∨  b^{118, 3}_1 ∨  b^{118, 3}_0 ∨ false 
c  in DIMACS:
-19979  19980  19981  0

c  3 does not represent an automaton state.
c    -(-b^{118, 3}_2 ∧  b^{118, 3}_1 ∧  b^{118, 3}_0 ∧ true) 
c  in CNF:
c     b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ false 
c  in DIMACS:
 19979 -19980 -19981  0
c  -3 does not represent an automaton state.
c    -( b^{118, 3}_2 ∧  b^{118, 3}_1 ∧  b^{118, 3}_0 ∧ true) 
c  in CNF:
c    -b^{118, 3}_2 ∨ -b^{118, 3}_1 ∨ -b^{118, 3}_0 ∨ false 
c  in DIMACS:
-19979 -19980 -19981  0

c i = 4
c  -2+1 --> -1
c    ( b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧  p_472) -> ( b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0)
c  in CNF:
c    -b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨  b^{118, 5}_2
c    -b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_1
c    -b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨  b^{118, 5}_0
c  in DIMACS:
-19982 -19983  19984 -472  19985 0
-19982 -19983  19984 -472 -19986 0
-19982 -19983  19984 -472  19987 0

c  -1+1 --> 0
c    ( b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0 ∧  p_472) -> (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧ -b^{118, 5}_0)
c  in CNF:
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_2
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_1
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_0
c  in DIMACS:
-19982  19983 -19984 -472 -19985 0
-19982  19983 -19984 -472 -19986 0
-19982  19983 -19984 -472 -19987 0

c  0+1 --> 1
c    (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧  p_472) -> (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0)
c  in CNF:
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_2
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_1
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨  b^{118, 5}_0
c  in DIMACS:
 19982  19983  19984 -472 -19985 0
 19982  19983  19984 -472 -19986 0
 19982  19983  19984 -472  19987 0

c  1+1 --> 2
c    (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0 ∧  p_472) -> (-b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0)
c  in CNF:
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_2
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨  b^{118, 5}_1
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ -p_472 ∨ -b^{118, 5}_0
c  in DIMACS:
 19982  19983 -19984 -472 -19985 0
 19982  19983 -19984 -472  19986 0
 19982  19983 -19984 -472 -19987 0

c  2+1 --> break 
c    (-b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧  p_472) -> break
c  in CNF:
c     b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 19982 -19983  19984 -472 1162 0


c  2-1 --> 1
c    (-b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧ -p_472) -> (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0)
c  in CNF:
c     b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_2
c     b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_1
c     b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨  b^{118, 5}_0
c  in DIMACS:
 19982 -19983  19984  472 -19985 0
 19982 -19983  19984  472 -19986 0
 19982 -19983  19984  472  19987 0

c  1-1 --> 0
c    (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0 ∧ -p_472) -> (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧ -b^{118, 5}_0)
c  in CNF:
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_2
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_1
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_0
c  in DIMACS:
 19982  19983 -19984  472 -19985 0
 19982  19983 -19984  472 -19986 0
 19982  19983 -19984  472 -19987 0

c  0-1 --> -1
c    (-b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧ -p_472) -> ( b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0)
c  in CNF:
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨  b^{118, 5}_2
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_1
c     b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨  b^{118, 5}_0
c  in DIMACS:
 19982  19983  19984  472  19985 0
 19982  19983  19984  472 -19986 0
 19982  19983  19984  472  19987 0

c  -1-1 --> -2
c    ( b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧  b^{118, 4}_0 ∧ -p_472) -> ( b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0)
c  in CNF:
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨  b^{118, 5}_2
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨  b^{118, 5}_1
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨  p_472 ∨ -b^{118, 5}_0
c  in DIMACS:
-19982  19983 -19984  472  19985 0
-19982  19983 -19984  472  19986 0
-19982  19983 -19984  472 -19987 0

c  -2-1 --> break 
c    ( b^{118, 4}_2 ∧  b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨  b^{118, 4}_0 ∨  p_472 ∨ break
c  in DIMACS:
-19982 -19983  19984  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 4}_2 ∧ -b^{118, 4}_1 ∧ -b^{118, 4}_0 ∧ true) 
c  in CNF:
c    -b^{118, 4}_2 ∨  b^{118, 4}_1 ∨  b^{118, 4}_0 ∨ false 
c  in DIMACS:
-19982  19983  19984  0

c  3 does not represent an automaton state.
c    -(-b^{118, 4}_2 ∧  b^{118, 4}_1 ∧  b^{118, 4}_0 ∧ true) 
c  in CNF:
c     b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ false 
c  in DIMACS:
 19982 -19983 -19984  0
c  -3 does not represent an automaton state.
c    -( b^{118, 4}_2 ∧  b^{118, 4}_1 ∧  b^{118, 4}_0 ∧ true) 
c  in CNF:
c    -b^{118, 4}_2 ∨ -b^{118, 4}_1 ∨ -b^{118, 4}_0 ∨ false 
c  in DIMACS:
-19982 -19983 -19984  0

c i = 5
c  -2+1 --> -1
c    ( b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧  p_590) -> ( b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0)
c  in CNF:
c    -b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨  b^{118, 6}_2
c    -b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_1
c    -b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨  b^{118, 6}_0
c  in DIMACS:
-19985 -19986  19987 -590  19988 0
-19985 -19986  19987 -590 -19989 0
-19985 -19986  19987 -590  19990 0

c  -1+1 --> 0
c    ( b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0 ∧  p_590) -> (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧ -b^{118, 6}_0)
c  in CNF:
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_2
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_1
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_0
c  in DIMACS:
-19985  19986 -19987 -590 -19988 0
-19985  19986 -19987 -590 -19989 0
-19985  19986 -19987 -590 -19990 0

c  0+1 --> 1
c    (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧  p_590) -> (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0)
c  in CNF:
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_2
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_1
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨  b^{118, 6}_0
c  in DIMACS:
 19985  19986  19987 -590 -19988 0
 19985  19986  19987 -590 -19989 0
 19985  19986  19987 -590  19990 0

c  1+1 --> 2
c    (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0 ∧  p_590) -> (-b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0)
c  in CNF:
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_2
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨  b^{118, 6}_1
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ -p_590 ∨ -b^{118, 6}_0
c  in DIMACS:
 19985  19986 -19987 -590 -19988 0
 19985  19986 -19987 -590  19989 0
 19985  19986 -19987 -590 -19990 0

c  2+1 --> break 
c    (-b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧  p_590) -> break
c  in CNF:
c     b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 19985 -19986  19987 -590 1162 0


c  2-1 --> 1
c    (-b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧ -p_590) -> (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0)
c  in CNF:
c     b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_2
c     b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_1
c     b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨  b^{118, 6}_0
c  in DIMACS:
 19985 -19986  19987  590 -19988 0
 19985 -19986  19987  590 -19989 0
 19985 -19986  19987  590  19990 0

c  1-1 --> 0
c    (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0 ∧ -p_590) -> (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧ -b^{118, 6}_0)
c  in CNF:
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_2
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_1
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_0
c  in DIMACS:
 19985  19986 -19987  590 -19988 0
 19985  19986 -19987  590 -19989 0
 19985  19986 -19987  590 -19990 0

c  0-1 --> -1
c    (-b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧ -p_590) -> ( b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0)
c  in CNF:
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨  b^{118, 6}_2
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_1
c     b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨  b^{118, 6}_0
c  in DIMACS:
 19985  19986  19987  590  19988 0
 19985  19986  19987  590 -19989 0
 19985  19986  19987  590  19990 0

c  -1-1 --> -2
c    ( b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧  b^{118, 5}_0 ∧ -p_590) -> ( b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0)
c  in CNF:
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨  b^{118, 6}_2
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨  b^{118, 6}_1
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨  p_590 ∨ -b^{118, 6}_0
c  in DIMACS:
-19985  19986 -19987  590  19988 0
-19985  19986 -19987  590  19989 0
-19985  19986 -19987  590 -19990 0

c  -2-1 --> break 
c    ( b^{118, 5}_2 ∧  b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨  b^{118, 5}_0 ∨  p_590 ∨ break
c  in DIMACS:
-19985 -19986  19987  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 5}_2 ∧ -b^{118, 5}_1 ∧ -b^{118, 5}_0 ∧ true) 
c  in CNF:
c    -b^{118, 5}_2 ∨  b^{118, 5}_1 ∨  b^{118, 5}_0 ∨ false 
c  in DIMACS:
-19985  19986  19987  0

c  3 does not represent an automaton state.
c    -(-b^{118, 5}_2 ∧  b^{118, 5}_1 ∧  b^{118, 5}_0 ∧ true) 
c  in CNF:
c     b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ false 
c  in DIMACS:
 19985 -19986 -19987  0
c  -3 does not represent an automaton state.
c    -( b^{118, 5}_2 ∧  b^{118, 5}_1 ∧  b^{118, 5}_0 ∧ true) 
c  in CNF:
c    -b^{118, 5}_2 ∨ -b^{118, 5}_1 ∨ -b^{118, 5}_0 ∨ false 
c  in DIMACS:
-19985 -19986 -19987  0

c i = 6
c  -2+1 --> -1
c    ( b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧  p_708) -> ( b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0)
c  in CNF:
c    -b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨  b^{118, 7}_2
c    -b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_1
c    -b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨  b^{118, 7}_0
c  in DIMACS:
-19988 -19989  19990 -708  19991 0
-19988 -19989  19990 -708 -19992 0
-19988 -19989  19990 -708  19993 0

c  -1+1 --> 0
c    ( b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0 ∧  p_708) -> (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧ -b^{118, 7}_0)
c  in CNF:
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_2
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_1
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_0
c  in DIMACS:
-19988  19989 -19990 -708 -19991 0
-19988  19989 -19990 -708 -19992 0
-19988  19989 -19990 -708 -19993 0

c  0+1 --> 1
c    (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧  p_708) -> (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0)
c  in CNF:
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_2
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_1
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨  b^{118, 7}_0
c  in DIMACS:
 19988  19989  19990 -708 -19991 0
 19988  19989  19990 -708 -19992 0
 19988  19989  19990 -708  19993 0

c  1+1 --> 2
c    (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0 ∧  p_708) -> (-b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0)
c  in CNF:
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_2
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨  b^{118, 7}_1
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ -p_708 ∨ -b^{118, 7}_0
c  in DIMACS:
 19988  19989 -19990 -708 -19991 0
 19988  19989 -19990 -708  19992 0
 19988  19989 -19990 -708 -19993 0

c  2+1 --> break 
c    (-b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧  p_708) -> break
c  in CNF:
c     b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 19988 -19989  19990 -708 1162 0


c  2-1 --> 1
c    (-b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧ -p_708) -> (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0)
c  in CNF:
c     b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_2
c     b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_1
c     b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨  b^{118, 7}_0
c  in DIMACS:
 19988 -19989  19990  708 -19991 0
 19988 -19989  19990  708 -19992 0
 19988 -19989  19990  708  19993 0

c  1-1 --> 0
c    (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0 ∧ -p_708) -> (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧ -b^{118, 7}_0)
c  in CNF:
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_2
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_1
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_0
c  in DIMACS:
 19988  19989 -19990  708 -19991 0
 19988  19989 -19990  708 -19992 0
 19988  19989 -19990  708 -19993 0

c  0-1 --> -1
c    (-b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧ -p_708) -> ( b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0)
c  in CNF:
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨  b^{118, 7}_2
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_1
c     b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨  b^{118, 7}_0
c  in DIMACS:
 19988  19989  19990  708  19991 0
 19988  19989  19990  708 -19992 0
 19988  19989  19990  708  19993 0

c  -1-1 --> -2
c    ( b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧  b^{118, 6}_0 ∧ -p_708) -> ( b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0)
c  in CNF:
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨  b^{118, 7}_2
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨  b^{118, 7}_1
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨  p_708 ∨ -b^{118, 7}_0
c  in DIMACS:
-19988  19989 -19990  708  19991 0
-19988  19989 -19990  708  19992 0
-19988  19989 -19990  708 -19993 0

c  -2-1 --> break 
c    ( b^{118, 6}_2 ∧  b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨  b^{118, 6}_0 ∨  p_708 ∨ break
c  in DIMACS:
-19988 -19989  19990  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 6}_2 ∧ -b^{118, 6}_1 ∧ -b^{118, 6}_0 ∧ true) 
c  in CNF:
c    -b^{118, 6}_2 ∨  b^{118, 6}_1 ∨  b^{118, 6}_0 ∨ false 
c  in DIMACS:
-19988  19989  19990  0

c  3 does not represent an automaton state.
c    -(-b^{118, 6}_2 ∧  b^{118, 6}_1 ∧  b^{118, 6}_0 ∧ true) 
c  in CNF:
c     b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ false 
c  in DIMACS:
 19988 -19989 -19990  0
c  -3 does not represent an automaton state.
c    -( b^{118, 6}_2 ∧  b^{118, 6}_1 ∧  b^{118, 6}_0 ∧ true) 
c  in CNF:
c    -b^{118, 6}_2 ∨ -b^{118, 6}_1 ∨ -b^{118, 6}_0 ∨ false 
c  in DIMACS:
-19988 -19989 -19990  0

c i = 7
c  -2+1 --> -1
c    ( b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧  p_826) -> ( b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0)
c  in CNF:
c    -b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨  b^{118, 8}_2
c    -b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_1
c    -b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨  b^{118, 8}_0
c  in DIMACS:
-19991 -19992  19993 -826  19994 0
-19991 -19992  19993 -826 -19995 0
-19991 -19992  19993 -826  19996 0

c  -1+1 --> 0
c    ( b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0 ∧  p_826) -> (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧ -b^{118, 8}_0)
c  in CNF:
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_2
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_1
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_0
c  in DIMACS:
-19991  19992 -19993 -826 -19994 0
-19991  19992 -19993 -826 -19995 0
-19991  19992 -19993 -826 -19996 0

c  0+1 --> 1
c    (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧  p_826) -> (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0)
c  in CNF:
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_2
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_1
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨  b^{118, 8}_0
c  in DIMACS:
 19991  19992  19993 -826 -19994 0
 19991  19992  19993 -826 -19995 0
 19991  19992  19993 -826  19996 0

c  1+1 --> 2
c    (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0 ∧  p_826) -> (-b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0)
c  in CNF:
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_2
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨  b^{118, 8}_1
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ -p_826 ∨ -b^{118, 8}_0
c  in DIMACS:
 19991  19992 -19993 -826 -19994 0
 19991  19992 -19993 -826  19995 0
 19991  19992 -19993 -826 -19996 0

c  2+1 --> break 
c    (-b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧  p_826) -> break
c  in CNF:
c     b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ -p_826 ∨ break
c  in DIMACS:
 19991 -19992  19993 -826 1162 0


c  2-1 --> 1
c    (-b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧ -p_826) -> (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0)
c  in CNF:
c     b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_2
c     b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_1
c     b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨  b^{118, 8}_0
c  in DIMACS:
 19991 -19992  19993  826 -19994 0
 19991 -19992  19993  826 -19995 0
 19991 -19992  19993  826  19996 0

c  1-1 --> 0
c    (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0 ∧ -p_826) -> (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧ -b^{118, 8}_0)
c  in CNF:
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_2
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_1
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_0
c  in DIMACS:
 19991  19992 -19993  826 -19994 0
 19991  19992 -19993  826 -19995 0
 19991  19992 -19993  826 -19996 0

c  0-1 --> -1
c    (-b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧ -p_826) -> ( b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0)
c  in CNF:
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨  b^{118, 8}_2
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_1
c     b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨  b^{118, 8}_0
c  in DIMACS:
 19991  19992  19993  826  19994 0
 19991  19992  19993  826 -19995 0
 19991  19992  19993  826  19996 0

c  -1-1 --> -2
c    ( b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧  b^{118, 7}_0 ∧ -p_826) -> ( b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0)
c  in CNF:
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨  b^{118, 8}_2
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨  b^{118, 8}_1
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨  p_826 ∨ -b^{118, 8}_0
c  in DIMACS:
-19991  19992 -19993  826  19994 0
-19991  19992 -19993  826  19995 0
-19991  19992 -19993  826 -19996 0

c  -2-1 --> break 
c    ( b^{118, 7}_2 ∧  b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧ -p_826) -> break
c  in CNF:
c    -b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨  b^{118, 7}_0 ∨  p_826 ∨ break
c  in DIMACS:
-19991 -19992  19993  826 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 7}_2 ∧ -b^{118, 7}_1 ∧ -b^{118, 7}_0 ∧ true) 
c  in CNF:
c    -b^{118, 7}_2 ∨  b^{118, 7}_1 ∨  b^{118, 7}_0 ∨ false 
c  in DIMACS:
-19991  19992  19993  0

c  3 does not represent an automaton state.
c    -(-b^{118, 7}_2 ∧  b^{118, 7}_1 ∧  b^{118, 7}_0 ∧ true) 
c  in CNF:
c     b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ false 
c  in DIMACS:
 19991 -19992 -19993  0
c  -3 does not represent an automaton state.
c    -( b^{118, 7}_2 ∧  b^{118, 7}_1 ∧  b^{118, 7}_0 ∧ true) 
c  in CNF:
c    -b^{118, 7}_2 ∨ -b^{118, 7}_1 ∨ -b^{118, 7}_0 ∨ false 
c  in DIMACS:
-19991 -19992 -19993  0

c i = 8
c  -2+1 --> -1
c    ( b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧  p_944) -> ( b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0)
c  in CNF:
c    -b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨  b^{118, 9}_2
c    -b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_1
c    -b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨  b^{118, 9}_0
c  in DIMACS:
-19994 -19995  19996 -944  19997 0
-19994 -19995  19996 -944 -19998 0
-19994 -19995  19996 -944  19999 0

c  -1+1 --> 0
c    ( b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0 ∧  p_944) -> (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧ -b^{118, 9}_0)
c  in CNF:
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_2
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_1
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_0
c  in DIMACS:
-19994  19995 -19996 -944 -19997 0
-19994  19995 -19996 -944 -19998 0
-19994  19995 -19996 -944 -19999 0

c  0+1 --> 1
c    (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧  p_944) -> (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0)
c  in CNF:
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_2
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_1
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨  b^{118, 9}_0
c  in DIMACS:
 19994  19995  19996 -944 -19997 0
 19994  19995  19996 -944 -19998 0
 19994  19995  19996 -944  19999 0

c  1+1 --> 2
c    (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0 ∧  p_944) -> (-b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0)
c  in CNF:
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_2
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨  b^{118, 9}_1
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ -p_944 ∨ -b^{118, 9}_0
c  in DIMACS:
 19994  19995 -19996 -944 -19997 0
 19994  19995 -19996 -944  19998 0
 19994  19995 -19996 -944 -19999 0

c  2+1 --> break 
c    (-b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧  p_944) -> break
c  in CNF:
c     b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 19994 -19995  19996 -944 1162 0


c  2-1 --> 1
c    (-b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧ -p_944) -> (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0)
c  in CNF:
c     b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_2
c     b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_1
c     b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨  b^{118, 9}_0
c  in DIMACS:
 19994 -19995  19996  944 -19997 0
 19994 -19995  19996  944 -19998 0
 19994 -19995  19996  944  19999 0

c  1-1 --> 0
c    (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0 ∧ -p_944) -> (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧ -b^{118, 9}_0)
c  in CNF:
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_2
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_1
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_0
c  in DIMACS:
 19994  19995 -19996  944 -19997 0
 19994  19995 -19996  944 -19998 0
 19994  19995 -19996  944 -19999 0

c  0-1 --> -1
c    (-b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧ -p_944) -> ( b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0)
c  in CNF:
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨  b^{118, 9}_2
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_1
c     b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨  b^{118, 9}_0
c  in DIMACS:
 19994  19995  19996  944  19997 0
 19994  19995  19996  944 -19998 0
 19994  19995  19996  944  19999 0

c  -1-1 --> -2
c    ( b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧  b^{118, 8}_0 ∧ -p_944) -> ( b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0)
c  in CNF:
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨  b^{118, 9}_2
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨  b^{118, 9}_1
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨  p_944 ∨ -b^{118, 9}_0
c  in DIMACS:
-19994  19995 -19996  944  19997 0
-19994  19995 -19996  944  19998 0
-19994  19995 -19996  944 -19999 0

c  -2-1 --> break 
c    ( b^{118, 8}_2 ∧  b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨  b^{118, 8}_0 ∨  p_944 ∨ break
c  in DIMACS:
-19994 -19995  19996  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 8}_2 ∧ -b^{118, 8}_1 ∧ -b^{118, 8}_0 ∧ true) 
c  in CNF:
c    -b^{118, 8}_2 ∨  b^{118, 8}_1 ∨  b^{118, 8}_0 ∨ false 
c  in DIMACS:
-19994  19995  19996  0

c  3 does not represent an automaton state.
c    -(-b^{118, 8}_2 ∧  b^{118, 8}_1 ∧  b^{118, 8}_0 ∧ true) 
c  in CNF:
c     b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ false 
c  in DIMACS:
 19994 -19995 -19996  0
c  -3 does not represent an automaton state.
c    -( b^{118, 8}_2 ∧  b^{118, 8}_1 ∧  b^{118, 8}_0 ∧ true) 
c  in CNF:
c    -b^{118, 8}_2 ∨ -b^{118, 8}_1 ∨ -b^{118, 8}_0 ∨ false 
c  in DIMACS:
-19994 -19995 -19996  0

c i = 9
c  -2+1 --> -1
c    ( b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧  p_1062) -> ( b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧  b^{118, 10}_0)
c  in CNF:
c    -b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨  b^{118, 10}_2
c    -b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_1
c    -b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨  b^{118, 10}_0
c  in DIMACS:
-19997 -19998  19999 -1062  20000 0
-19997 -19998  19999 -1062 -20001 0
-19997 -19998  19999 -1062  20002 0

c  -1+1 --> 0
c    ( b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0 ∧  p_1062) -> (-b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧ -b^{118, 10}_0)
c  in CNF:
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_2
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_1
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_0
c  in DIMACS:
-19997  19998 -19999 -1062 -20000 0
-19997  19998 -19999 -1062 -20001 0
-19997  19998 -19999 -1062 -20002 0

c  0+1 --> 1
c    (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧  p_1062) -> (-b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧  b^{118, 10}_0)
c  in CNF:
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_2
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_1
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨  b^{118, 10}_0
c  in DIMACS:
 19997  19998  19999 -1062 -20000 0
 19997  19998  19999 -1062 -20001 0
 19997  19998  19999 -1062  20002 0

c  1+1 --> 2
c    (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0 ∧  p_1062) -> (-b^{118, 10}_2 ∧  b^{118, 10}_1 ∧ -b^{118, 10}_0)
c  in CNF:
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_2
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨  b^{118, 10}_1
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ -p_1062 ∨ -b^{118, 10}_0
c  in DIMACS:
 19997  19998 -19999 -1062 -20000 0
 19997  19998 -19999 -1062  20001 0
 19997  19998 -19999 -1062 -20002 0

c  2+1 --> break 
c    (-b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 19997 -19998  19999 -1062 1162 0


c  2-1 --> 1
c    (-b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧ -p_1062) -> (-b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧  b^{118, 10}_0)
c  in CNF:
c     b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_2
c     b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_1
c     b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨  b^{118, 10}_0
c  in DIMACS:
 19997 -19998  19999  1062 -20000 0
 19997 -19998  19999  1062 -20001 0
 19997 -19998  19999  1062  20002 0

c  1-1 --> 0
c    (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0 ∧ -p_1062) -> (-b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧ -b^{118, 10}_0)
c  in CNF:
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_2
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_1
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_0
c  in DIMACS:
 19997  19998 -19999  1062 -20000 0
 19997  19998 -19999  1062 -20001 0
 19997  19998 -19999  1062 -20002 0

c  0-1 --> -1
c    (-b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧ -p_1062) -> ( b^{118, 10}_2 ∧ -b^{118, 10}_1 ∧  b^{118, 10}_0)
c  in CNF:
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨  b^{118, 10}_2
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_1
c     b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨  b^{118, 10}_0
c  in DIMACS:
 19997  19998  19999  1062  20000 0
 19997  19998  19999  1062 -20001 0
 19997  19998  19999  1062  20002 0

c  -1-1 --> -2
c    ( b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧  b^{118, 9}_0 ∧ -p_1062) -> ( b^{118, 10}_2 ∧  b^{118, 10}_1 ∧ -b^{118, 10}_0)
c  in CNF:
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨  b^{118, 10}_2
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨  b^{118, 10}_1
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨  p_1062 ∨ -b^{118, 10}_0
c  in DIMACS:
-19997  19998 -19999  1062  20000 0
-19997  19998 -19999  1062  20001 0
-19997  19998 -19999  1062 -20002 0

c  -2-1 --> break 
c    ( b^{118, 9}_2 ∧  b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨  b^{118, 9}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-19997 -19998  19999  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{118, 9}_2 ∧ -b^{118, 9}_1 ∧ -b^{118, 9}_0 ∧ true) 
c  in CNF:
c    -b^{118, 9}_2 ∨  b^{118, 9}_1 ∨  b^{118, 9}_0 ∨ false 
c  in DIMACS:
-19997  19998  19999  0

c  3 does not represent an automaton state.
c    -(-b^{118, 9}_2 ∧  b^{118, 9}_1 ∧  b^{118, 9}_0 ∧ true) 
c  in CNF:
c     b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ false 
c  in DIMACS:
 19997 -19998 -19999  0
c  -3 does not represent an automaton state.
c    -( b^{118, 9}_2 ∧  b^{118, 9}_1 ∧  b^{118, 9}_0 ∧ true) 
c  in CNF:
c    -b^{118, 9}_2 ∨ -b^{118, 9}_1 ∨ -b^{118, 9}_0 ∨ false 
c  in DIMACS:
-19997 -19998 -19999  0

c INIT for k = 119
c    -b^{119, 1}_2
c    -b^{119, 1}_1
c    -b^{119, 1}_0
c  in DIMACS:
-20003 0
-20004 0
-20005 0

c Transitions for k = 119
c i = 1
c  -2+1 --> -1
c    ( b^{119, 1}_2 ∧  b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧  p_119) -> ( b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0)
c  in CNF:
c    -b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨  b^{119, 2}_2
c    -b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_1
c    -b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨  b^{119, 2}_0
c  in DIMACS:
-20003 -20004  20005 -119  20006 0
-20003 -20004  20005 -119 -20007 0
-20003 -20004  20005 -119  20008 0

c  -1+1 --> 0
c    ( b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧  b^{119, 1}_0 ∧  p_119) -> (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧ -b^{119, 2}_0)
c  in CNF:
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_2
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_1
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_0
c  in DIMACS:
-20003  20004 -20005 -119 -20006 0
-20003  20004 -20005 -119 -20007 0
-20003  20004 -20005 -119 -20008 0

c  0+1 --> 1
c    (-b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧  p_119) -> (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0)
c  in CNF:
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_2
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_1
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨  b^{119, 2}_0
c  in DIMACS:
 20003  20004  20005 -119 -20006 0
 20003  20004  20005 -119 -20007 0
 20003  20004  20005 -119  20008 0

c  1+1 --> 2
c    (-b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧  b^{119, 1}_0 ∧  p_119) -> (-b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0)
c  in CNF:
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_2
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨  b^{119, 2}_1
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ -p_119 ∨ -b^{119, 2}_0
c  in DIMACS:
 20003  20004 -20005 -119 -20006 0
 20003  20004 -20005 -119  20007 0
 20003  20004 -20005 -119 -20008 0

c  2+1 --> break 
c    (-b^{119, 1}_2 ∧  b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧  p_119) -> break
c  in CNF:
c     b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ -p_119 ∨ break
c  in DIMACS:
 20003 -20004  20005 -119 1162 0


c  2-1 --> 1
c    (-b^{119, 1}_2 ∧  b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧ -p_119) -> (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0)
c  in CNF:
c     b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_2
c     b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_1
c     b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨  b^{119, 2}_0
c  in DIMACS:
 20003 -20004  20005  119 -20006 0
 20003 -20004  20005  119 -20007 0
 20003 -20004  20005  119  20008 0

c  1-1 --> 0
c    (-b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧  b^{119, 1}_0 ∧ -p_119) -> (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧ -b^{119, 2}_0)
c  in CNF:
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_2
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_1
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_0
c  in DIMACS:
 20003  20004 -20005  119 -20006 0
 20003  20004 -20005  119 -20007 0
 20003  20004 -20005  119 -20008 0

c  0-1 --> -1
c    (-b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧ -p_119) -> ( b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0)
c  in CNF:
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨  b^{119, 2}_2
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_1
c     b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨  b^{119, 2}_0
c  in DIMACS:
 20003  20004  20005  119  20006 0
 20003  20004  20005  119 -20007 0
 20003  20004  20005  119  20008 0

c  -1-1 --> -2
c    ( b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧  b^{119, 1}_0 ∧ -p_119) -> ( b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0)
c  in CNF:
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨  b^{119, 2}_2
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨  b^{119, 2}_1
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨  p_119 ∨ -b^{119, 2}_0
c  in DIMACS:
-20003  20004 -20005  119  20006 0
-20003  20004 -20005  119  20007 0
-20003  20004 -20005  119 -20008 0

c  -2-1 --> break 
c    ( b^{119, 1}_2 ∧  b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧ -p_119) -> break
c  in CNF:
c    -b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨  b^{119, 1}_0 ∨  p_119 ∨ break
c  in DIMACS:
-20003 -20004  20005  119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 1}_2 ∧ -b^{119, 1}_1 ∧ -b^{119, 1}_0 ∧ true) 
c  in CNF:
c    -b^{119, 1}_2 ∨  b^{119, 1}_1 ∨  b^{119, 1}_0 ∨ false 
c  in DIMACS:
-20003  20004  20005  0

c  3 does not represent an automaton state.
c    -(-b^{119, 1}_2 ∧  b^{119, 1}_1 ∧  b^{119, 1}_0 ∧ true) 
c  in CNF:
c     b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ false 
c  in DIMACS:
 20003 -20004 -20005  0
c  -3 does not represent an automaton state.
c    -( b^{119, 1}_2 ∧  b^{119, 1}_1 ∧  b^{119, 1}_0 ∧ true) 
c  in CNF:
c    -b^{119, 1}_2 ∨ -b^{119, 1}_1 ∨ -b^{119, 1}_0 ∨ false 
c  in DIMACS:
-20003 -20004 -20005  0

c i = 2
c  -2+1 --> -1
c    ( b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧  p_238) -> ( b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0)
c  in CNF:
c    -b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨  b^{119, 3}_2
c    -b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_1
c    -b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨  b^{119, 3}_0
c  in DIMACS:
-20006 -20007  20008 -238  20009 0
-20006 -20007  20008 -238 -20010 0
-20006 -20007  20008 -238  20011 0

c  -1+1 --> 0
c    ( b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0 ∧  p_238) -> (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧ -b^{119, 3}_0)
c  in CNF:
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_2
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_1
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_0
c  in DIMACS:
-20006  20007 -20008 -238 -20009 0
-20006  20007 -20008 -238 -20010 0
-20006  20007 -20008 -238 -20011 0

c  0+1 --> 1
c    (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧  p_238) -> (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0)
c  in CNF:
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_2
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_1
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨  b^{119, 3}_0
c  in DIMACS:
 20006  20007  20008 -238 -20009 0
 20006  20007  20008 -238 -20010 0
 20006  20007  20008 -238  20011 0

c  1+1 --> 2
c    (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0 ∧  p_238) -> (-b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0)
c  in CNF:
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_2
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨  b^{119, 3}_1
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ -p_238 ∨ -b^{119, 3}_0
c  in DIMACS:
 20006  20007 -20008 -238 -20009 0
 20006  20007 -20008 -238  20010 0
 20006  20007 -20008 -238 -20011 0

c  2+1 --> break 
c    (-b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧  p_238) -> break
c  in CNF:
c     b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 20006 -20007  20008 -238 1162 0


c  2-1 --> 1
c    (-b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧ -p_238) -> (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0)
c  in CNF:
c     b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_2
c     b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_1
c     b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨  b^{119, 3}_0
c  in DIMACS:
 20006 -20007  20008  238 -20009 0
 20006 -20007  20008  238 -20010 0
 20006 -20007  20008  238  20011 0

c  1-1 --> 0
c    (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0 ∧ -p_238) -> (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧ -b^{119, 3}_0)
c  in CNF:
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_2
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_1
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_0
c  in DIMACS:
 20006  20007 -20008  238 -20009 0
 20006  20007 -20008  238 -20010 0
 20006  20007 -20008  238 -20011 0

c  0-1 --> -1
c    (-b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧ -p_238) -> ( b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0)
c  in CNF:
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨  b^{119, 3}_2
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_1
c     b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨  b^{119, 3}_0
c  in DIMACS:
 20006  20007  20008  238  20009 0
 20006  20007  20008  238 -20010 0
 20006  20007  20008  238  20011 0

c  -1-1 --> -2
c    ( b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧  b^{119, 2}_0 ∧ -p_238) -> ( b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0)
c  in CNF:
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨  b^{119, 3}_2
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨  b^{119, 3}_1
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨  p_238 ∨ -b^{119, 3}_0
c  in DIMACS:
-20006  20007 -20008  238  20009 0
-20006  20007 -20008  238  20010 0
-20006  20007 -20008  238 -20011 0

c  -2-1 --> break 
c    ( b^{119, 2}_2 ∧  b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨  b^{119, 2}_0 ∨  p_238 ∨ break
c  in DIMACS:
-20006 -20007  20008  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 2}_2 ∧ -b^{119, 2}_1 ∧ -b^{119, 2}_0 ∧ true) 
c  in CNF:
c    -b^{119, 2}_2 ∨  b^{119, 2}_1 ∨  b^{119, 2}_0 ∨ false 
c  in DIMACS:
-20006  20007  20008  0

c  3 does not represent an automaton state.
c    -(-b^{119, 2}_2 ∧  b^{119, 2}_1 ∧  b^{119, 2}_0 ∧ true) 
c  in CNF:
c     b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ false 
c  in DIMACS:
 20006 -20007 -20008  0
c  -3 does not represent an automaton state.
c    -( b^{119, 2}_2 ∧  b^{119, 2}_1 ∧  b^{119, 2}_0 ∧ true) 
c  in CNF:
c    -b^{119, 2}_2 ∨ -b^{119, 2}_1 ∨ -b^{119, 2}_0 ∨ false 
c  in DIMACS:
-20006 -20007 -20008  0

c i = 3
c  -2+1 --> -1
c    ( b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧  p_357) -> ( b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0)
c  in CNF:
c    -b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨  b^{119, 4}_2
c    -b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_1
c    -b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨  b^{119, 4}_0
c  in DIMACS:
-20009 -20010  20011 -357  20012 0
-20009 -20010  20011 -357 -20013 0
-20009 -20010  20011 -357  20014 0

c  -1+1 --> 0
c    ( b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0 ∧  p_357) -> (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧ -b^{119, 4}_0)
c  in CNF:
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_2
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_1
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_0
c  in DIMACS:
-20009  20010 -20011 -357 -20012 0
-20009  20010 -20011 -357 -20013 0
-20009  20010 -20011 -357 -20014 0

c  0+1 --> 1
c    (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧  p_357) -> (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0)
c  in CNF:
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_2
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_1
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨  b^{119, 4}_0
c  in DIMACS:
 20009  20010  20011 -357 -20012 0
 20009  20010  20011 -357 -20013 0
 20009  20010  20011 -357  20014 0

c  1+1 --> 2
c    (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0 ∧  p_357) -> (-b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0)
c  in CNF:
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_2
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨  b^{119, 4}_1
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ -p_357 ∨ -b^{119, 4}_0
c  in DIMACS:
 20009  20010 -20011 -357 -20012 0
 20009  20010 -20011 -357  20013 0
 20009  20010 -20011 -357 -20014 0

c  2+1 --> break 
c    (-b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧  p_357) -> break
c  in CNF:
c     b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 20009 -20010  20011 -357 1162 0


c  2-1 --> 1
c    (-b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧ -p_357) -> (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0)
c  in CNF:
c     b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_2
c     b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_1
c     b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨  b^{119, 4}_0
c  in DIMACS:
 20009 -20010  20011  357 -20012 0
 20009 -20010  20011  357 -20013 0
 20009 -20010  20011  357  20014 0

c  1-1 --> 0
c    (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0 ∧ -p_357) -> (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧ -b^{119, 4}_0)
c  in CNF:
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_2
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_1
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_0
c  in DIMACS:
 20009  20010 -20011  357 -20012 0
 20009  20010 -20011  357 -20013 0
 20009  20010 -20011  357 -20014 0

c  0-1 --> -1
c    (-b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧ -p_357) -> ( b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0)
c  in CNF:
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨  b^{119, 4}_2
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_1
c     b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨  b^{119, 4}_0
c  in DIMACS:
 20009  20010  20011  357  20012 0
 20009  20010  20011  357 -20013 0
 20009  20010  20011  357  20014 0

c  -1-1 --> -2
c    ( b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧  b^{119, 3}_0 ∧ -p_357) -> ( b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0)
c  in CNF:
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨  b^{119, 4}_2
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨  b^{119, 4}_1
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨  p_357 ∨ -b^{119, 4}_0
c  in DIMACS:
-20009  20010 -20011  357  20012 0
-20009  20010 -20011  357  20013 0
-20009  20010 -20011  357 -20014 0

c  -2-1 --> break 
c    ( b^{119, 3}_2 ∧  b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨  b^{119, 3}_0 ∨  p_357 ∨ break
c  in DIMACS:
-20009 -20010  20011  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 3}_2 ∧ -b^{119, 3}_1 ∧ -b^{119, 3}_0 ∧ true) 
c  in CNF:
c    -b^{119, 3}_2 ∨  b^{119, 3}_1 ∨  b^{119, 3}_0 ∨ false 
c  in DIMACS:
-20009  20010  20011  0

c  3 does not represent an automaton state.
c    -(-b^{119, 3}_2 ∧  b^{119, 3}_1 ∧  b^{119, 3}_0 ∧ true) 
c  in CNF:
c     b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ false 
c  in DIMACS:
 20009 -20010 -20011  0
c  -3 does not represent an automaton state.
c    -( b^{119, 3}_2 ∧  b^{119, 3}_1 ∧  b^{119, 3}_0 ∧ true) 
c  in CNF:
c    -b^{119, 3}_2 ∨ -b^{119, 3}_1 ∨ -b^{119, 3}_0 ∨ false 
c  in DIMACS:
-20009 -20010 -20011  0

c i = 4
c  -2+1 --> -1
c    ( b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧  p_476) -> ( b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0)
c  in CNF:
c    -b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨  b^{119, 5}_2
c    -b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_1
c    -b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨  b^{119, 5}_0
c  in DIMACS:
-20012 -20013  20014 -476  20015 0
-20012 -20013  20014 -476 -20016 0
-20012 -20013  20014 -476  20017 0

c  -1+1 --> 0
c    ( b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0 ∧  p_476) -> (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧ -b^{119, 5}_0)
c  in CNF:
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_2
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_1
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_0
c  in DIMACS:
-20012  20013 -20014 -476 -20015 0
-20012  20013 -20014 -476 -20016 0
-20012  20013 -20014 -476 -20017 0

c  0+1 --> 1
c    (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧  p_476) -> (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0)
c  in CNF:
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_2
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_1
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨  b^{119, 5}_0
c  in DIMACS:
 20012  20013  20014 -476 -20015 0
 20012  20013  20014 -476 -20016 0
 20012  20013  20014 -476  20017 0

c  1+1 --> 2
c    (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0 ∧  p_476) -> (-b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0)
c  in CNF:
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_2
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨  b^{119, 5}_1
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ -p_476 ∨ -b^{119, 5}_0
c  in DIMACS:
 20012  20013 -20014 -476 -20015 0
 20012  20013 -20014 -476  20016 0
 20012  20013 -20014 -476 -20017 0

c  2+1 --> break 
c    (-b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧  p_476) -> break
c  in CNF:
c     b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 20012 -20013  20014 -476 1162 0


c  2-1 --> 1
c    (-b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧ -p_476) -> (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0)
c  in CNF:
c     b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_2
c     b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_1
c     b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨  b^{119, 5}_0
c  in DIMACS:
 20012 -20013  20014  476 -20015 0
 20012 -20013  20014  476 -20016 0
 20012 -20013  20014  476  20017 0

c  1-1 --> 0
c    (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0 ∧ -p_476) -> (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧ -b^{119, 5}_0)
c  in CNF:
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_2
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_1
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_0
c  in DIMACS:
 20012  20013 -20014  476 -20015 0
 20012  20013 -20014  476 -20016 0
 20012  20013 -20014  476 -20017 0

c  0-1 --> -1
c    (-b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧ -p_476) -> ( b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0)
c  in CNF:
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨  b^{119, 5}_2
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_1
c     b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨  b^{119, 5}_0
c  in DIMACS:
 20012  20013  20014  476  20015 0
 20012  20013  20014  476 -20016 0
 20012  20013  20014  476  20017 0

c  -1-1 --> -2
c    ( b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧  b^{119, 4}_0 ∧ -p_476) -> ( b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0)
c  in CNF:
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨  b^{119, 5}_2
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨  b^{119, 5}_1
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨  p_476 ∨ -b^{119, 5}_0
c  in DIMACS:
-20012  20013 -20014  476  20015 0
-20012  20013 -20014  476  20016 0
-20012  20013 -20014  476 -20017 0

c  -2-1 --> break 
c    ( b^{119, 4}_2 ∧  b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨  b^{119, 4}_0 ∨  p_476 ∨ break
c  in DIMACS:
-20012 -20013  20014  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 4}_2 ∧ -b^{119, 4}_1 ∧ -b^{119, 4}_0 ∧ true) 
c  in CNF:
c    -b^{119, 4}_2 ∨  b^{119, 4}_1 ∨  b^{119, 4}_0 ∨ false 
c  in DIMACS:
-20012  20013  20014  0

c  3 does not represent an automaton state.
c    -(-b^{119, 4}_2 ∧  b^{119, 4}_1 ∧  b^{119, 4}_0 ∧ true) 
c  in CNF:
c     b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ false 
c  in DIMACS:
 20012 -20013 -20014  0
c  -3 does not represent an automaton state.
c    -( b^{119, 4}_2 ∧  b^{119, 4}_1 ∧  b^{119, 4}_0 ∧ true) 
c  in CNF:
c    -b^{119, 4}_2 ∨ -b^{119, 4}_1 ∨ -b^{119, 4}_0 ∨ false 
c  in DIMACS:
-20012 -20013 -20014  0

c i = 5
c  -2+1 --> -1
c    ( b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧  p_595) -> ( b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0)
c  in CNF:
c    -b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨  b^{119, 6}_2
c    -b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_1
c    -b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨  b^{119, 6}_0
c  in DIMACS:
-20015 -20016  20017 -595  20018 0
-20015 -20016  20017 -595 -20019 0
-20015 -20016  20017 -595  20020 0

c  -1+1 --> 0
c    ( b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0 ∧  p_595) -> (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧ -b^{119, 6}_0)
c  in CNF:
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_2
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_1
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_0
c  in DIMACS:
-20015  20016 -20017 -595 -20018 0
-20015  20016 -20017 -595 -20019 0
-20015  20016 -20017 -595 -20020 0

c  0+1 --> 1
c    (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧  p_595) -> (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0)
c  in CNF:
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_2
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_1
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨  b^{119, 6}_0
c  in DIMACS:
 20015  20016  20017 -595 -20018 0
 20015  20016  20017 -595 -20019 0
 20015  20016  20017 -595  20020 0

c  1+1 --> 2
c    (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0 ∧  p_595) -> (-b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0)
c  in CNF:
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_2
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨  b^{119, 6}_1
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ -p_595 ∨ -b^{119, 6}_0
c  in DIMACS:
 20015  20016 -20017 -595 -20018 0
 20015  20016 -20017 -595  20019 0
 20015  20016 -20017 -595 -20020 0

c  2+1 --> break 
c    (-b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧  p_595) -> break
c  in CNF:
c     b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ -p_595 ∨ break
c  in DIMACS:
 20015 -20016  20017 -595 1162 0


c  2-1 --> 1
c    (-b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧ -p_595) -> (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0)
c  in CNF:
c     b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_2
c     b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_1
c     b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨  b^{119, 6}_0
c  in DIMACS:
 20015 -20016  20017  595 -20018 0
 20015 -20016  20017  595 -20019 0
 20015 -20016  20017  595  20020 0

c  1-1 --> 0
c    (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0 ∧ -p_595) -> (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧ -b^{119, 6}_0)
c  in CNF:
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_2
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_1
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_0
c  in DIMACS:
 20015  20016 -20017  595 -20018 0
 20015  20016 -20017  595 -20019 0
 20015  20016 -20017  595 -20020 0

c  0-1 --> -1
c    (-b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧ -p_595) -> ( b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0)
c  in CNF:
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨  b^{119, 6}_2
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_1
c     b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨  b^{119, 6}_0
c  in DIMACS:
 20015  20016  20017  595  20018 0
 20015  20016  20017  595 -20019 0
 20015  20016  20017  595  20020 0

c  -1-1 --> -2
c    ( b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧  b^{119, 5}_0 ∧ -p_595) -> ( b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0)
c  in CNF:
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨  b^{119, 6}_2
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨  b^{119, 6}_1
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨  p_595 ∨ -b^{119, 6}_0
c  in DIMACS:
-20015  20016 -20017  595  20018 0
-20015  20016 -20017  595  20019 0
-20015  20016 -20017  595 -20020 0

c  -2-1 --> break 
c    ( b^{119, 5}_2 ∧  b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧ -p_595) -> break
c  in CNF:
c    -b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨  b^{119, 5}_0 ∨  p_595 ∨ break
c  in DIMACS:
-20015 -20016  20017  595 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 5}_2 ∧ -b^{119, 5}_1 ∧ -b^{119, 5}_0 ∧ true) 
c  in CNF:
c    -b^{119, 5}_2 ∨  b^{119, 5}_1 ∨  b^{119, 5}_0 ∨ false 
c  in DIMACS:
-20015  20016  20017  0

c  3 does not represent an automaton state.
c    -(-b^{119, 5}_2 ∧  b^{119, 5}_1 ∧  b^{119, 5}_0 ∧ true) 
c  in CNF:
c     b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ false 
c  in DIMACS:
 20015 -20016 -20017  0
c  -3 does not represent an automaton state.
c    -( b^{119, 5}_2 ∧  b^{119, 5}_1 ∧  b^{119, 5}_0 ∧ true) 
c  in CNF:
c    -b^{119, 5}_2 ∨ -b^{119, 5}_1 ∨ -b^{119, 5}_0 ∨ false 
c  in DIMACS:
-20015 -20016 -20017  0

c i = 6
c  -2+1 --> -1
c    ( b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧  p_714) -> ( b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0)
c  in CNF:
c    -b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨  b^{119, 7}_2
c    -b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_1
c    -b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨  b^{119, 7}_0
c  in DIMACS:
-20018 -20019  20020 -714  20021 0
-20018 -20019  20020 -714 -20022 0
-20018 -20019  20020 -714  20023 0

c  -1+1 --> 0
c    ( b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0 ∧  p_714) -> (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧ -b^{119, 7}_0)
c  in CNF:
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_2
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_1
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_0
c  in DIMACS:
-20018  20019 -20020 -714 -20021 0
-20018  20019 -20020 -714 -20022 0
-20018  20019 -20020 -714 -20023 0

c  0+1 --> 1
c    (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧  p_714) -> (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0)
c  in CNF:
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_2
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_1
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨  b^{119, 7}_0
c  in DIMACS:
 20018  20019  20020 -714 -20021 0
 20018  20019  20020 -714 -20022 0
 20018  20019  20020 -714  20023 0

c  1+1 --> 2
c    (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0 ∧  p_714) -> (-b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0)
c  in CNF:
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_2
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨  b^{119, 7}_1
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ -p_714 ∨ -b^{119, 7}_0
c  in DIMACS:
 20018  20019 -20020 -714 -20021 0
 20018  20019 -20020 -714  20022 0
 20018  20019 -20020 -714 -20023 0

c  2+1 --> break 
c    (-b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧  p_714) -> break
c  in CNF:
c     b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 20018 -20019  20020 -714 1162 0


c  2-1 --> 1
c    (-b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧ -p_714) -> (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0)
c  in CNF:
c     b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_2
c     b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_1
c     b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨  b^{119, 7}_0
c  in DIMACS:
 20018 -20019  20020  714 -20021 0
 20018 -20019  20020  714 -20022 0
 20018 -20019  20020  714  20023 0

c  1-1 --> 0
c    (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0 ∧ -p_714) -> (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧ -b^{119, 7}_0)
c  in CNF:
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_2
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_1
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_0
c  in DIMACS:
 20018  20019 -20020  714 -20021 0
 20018  20019 -20020  714 -20022 0
 20018  20019 -20020  714 -20023 0

c  0-1 --> -1
c    (-b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧ -p_714) -> ( b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0)
c  in CNF:
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨  b^{119, 7}_2
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_1
c     b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨  b^{119, 7}_0
c  in DIMACS:
 20018  20019  20020  714  20021 0
 20018  20019  20020  714 -20022 0
 20018  20019  20020  714  20023 0

c  -1-1 --> -2
c    ( b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧  b^{119, 6}_0 ∧ -p_714) -> ( b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0)
c  in CNF:
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨  b^{119, 7}_2
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨  b^{119, 7}_1
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨  p_714 ∨ -b^{119, 7}_0
c  in DIMACS:
-20018  20019 -20020  714  20021 0
-20018  20019 -20020  714  20022 0
-20018  20019 -20020  714 -20023 0

c  -2-1 --> break 
c    ( b^{119, 6}_2 ∧  b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨  b^{119, 6}_0 ∨  p_714 ∨ break
c  in DIMACS:
-20018 -20019  20020  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 6}_2 ∧ -b^{119, 6}_1 ∧ -b^{119, 6}_0 ∧ true) 
c  in CNF:
c    -b^{119, 6}_2 ∨  b^{119, 6}_1 ∨  b^{119, 6}_0 ∨ false 
c  in DIMACS:
-20018  20019  20020  0

c  3 does not represent an automaton state.
c    -(-b^{119, 6}_2 ∧  b^{119, 6}_1 ∧  b^{119, 6}_0 ∧ true) 
c  in CNF:
c     b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ false 
c  in DIMACS:
 20018 -20019 -20020  0
c  -3 does not represent an automaton state.
c    -( b^{119, 6}_2 ∧  b^{119, 6}_1 ∧  b^{119, 6}_0 ∧ true) 
c  in CNF:
c    -b^{119, 6}_2 ∨ -b^{119, 6}_1 ∨ -b^{119, 6}_0 ∨ false 
c  in DIMACS:
-20018 -20019 -20020  0

c i = 7
c  -2+1 --> -1
c    ( b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧  p_833) -> ( b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0)
c  in CNF:
c    -b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨  b^{119, 8}_2
c    -b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_1
c    -b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨  b^{119, 8}_0
c  in DIMACS:
-20021 -20022  20023 -833  20024 0
-20021 -20022  20023 -833 -20025 0
-20021 -20022  20023 -833  20026 0

c  -1+1 --> 0
c    ( b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0 ∧  p_833) -> (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧ -b^{119, 8}_0)
c  in CNF:
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_2
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_1
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_0
c  in DIMACS:
-20021  20022 -20023 -833 -20024 0
-20021  20022 -20023 -833 -20025 0
-20021  20022 -20023 -833 -20026 0

c  0+1 --> 1
c    (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧  p_833) -> (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0)
c  in CNF:
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_2
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_1
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨  b^{119, 8}_0
c  in DIMACS:
 20021  20022  20023 -833 -20024 0
 20021  20022  20023 -833 -20025 0
 20021  20022  20023 -833  20026 0

c  1+1 --> 2
c    (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0 ∧  p_833) -> (-b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0)
c  in CNF:
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_2
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨  b^{119, 8}_1
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ -p_833 ∨ -b^{119, 8}_0
c  in DIMACS:
 20021  20022 -20023 -833 -20024 0
 20021  20022 -20023 -833  20025 0
 20021  20022 -20023 -833 -20026 0

c  2+1 --> break 
c    (-b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧  p_833) -> break
c  in CNF:
c     b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ -p_833 ∨ break
c  in DIMACS:
 20021 -20022  20023 -833 1162 0


c  2-1 --> 1
c    (-b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧ -p_833) -> (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0)
c  in CNF:
c     b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_2
c     b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_1
c     b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨  b^{119, 8}_0
c  in DIMACS:
 20021 -20022  20023  833 -20024 0
 20021 -20022  20023  833 -20025 0
 20021 -20022  20023  833  20026 0

c  1-1 --> 0
c    (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0 ∧ -p_833) -> (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧ -b^{119, 8}_0)
c  in CNF:
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_2
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_1
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_0
c  in DIMACS:
 20021  20022 -20023  833 -20024 0
 20021  20022 -20023  833 -20025 0
 20021  20022 -20023  833 -20026 0

c  0-1 --> -1
c    (-b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧ -p_833) -> ( b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0)
c  in CNF:
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨  b^{119, 8}_2
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_1
c     b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨  b^{119, 8}_0
c  in DIMACS:
 20021  20022  20023  833  20024 0
 20021  20022  20023  833 -20025 0
 20021  20022  20023  833  20026 0

c  -1-1 --> -2
c    ( b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧  b^{119, 7}_0 ∧ -p_833) -> ( b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0)
c  in CNF:
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨  b^{119, 8}_2
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨  b^{119, 8}_1
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨  p_833 ∨ -b^{119, 8}_0
c  in DIMACS:
-20021  20022 -20023  833  20024 0
-20021  20022 -20023  833  20025 0
-20021  20022 -20023  833 -20026 0

c  -2-1 --> break 
c    ( b^{119, 7}_2 ∧  b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧ -p_833) -> break
c  in CNF:
c    -b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨  b^{119, 7}_0 ∨  p_833 ∨ break
c  in DIMACS:
-20021 -20022  20023  833 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 7}_2 ∧ -b^{119, 7}_1 ∧ -b^{119, 7}_0 ∧ true) 
c  in CNF:
c    -b^{119, 7}_2 ∨  b^{119, 7}_1 ∨  b^{119, 7}_0 ∨ false 
c  in DIMACS:
-20021  20022  20023  0

c  3 does not represent an automaton state.
c    -(-b^{119, 7}_2 ∧  b^{119, 7}_1 ∧  b^{119, 7}_0 ∧ true) 
c  in CNF:
c     b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ false 
c  in DIMACS:
 20021 -20022 -20023  0
c  -3 does not represent an automaton state.
c    -( b^{119, 7}_2 ∧  b^{119, 7}_1 ∧  b^{119, 7}_0 ∧ true) 
c  in CNF:
c    -b^{119, 7}_2 ∨ -b^{119, 7}_1 ∨ -b^{119, 7}_0 ∨ false 
c  in DIMACS:
-20021 -20022 -20023  0

c i = 8
c  -2+1 --> -1
c    ( b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧  p_952) -> ( b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0)
c  in CNF:
c    -b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨  b^{119, 9}_2
c    -b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_1
c    -b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨  b^{119, 9}_0
c  in DIMACS:
-20024 -20025  20026 -952  20027 0
-20024 -20025  20026 -952 -20028 0
-20024 -20025  20026 -952  20029 0

c  -1+1 --> 0
c    ( b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0 ∧  p_952) -> (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧ -b^{119, 9}_0)
c  in CNF:
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_2
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_1
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_0
c  in DIMACS:
-20024  20025 -20026 -952 -20027 0
-20024  20025 -20026 -952 -20028 0
-20024  20025 -20026 -952 -20029 0

c  0+1 --> 1
c    (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧  p_952) -> (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0)
c  in CNF:
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_2
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_1
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨  b^{119, 9}_0
c  in DIMACS:
 20024  20025  20026 -952 -20027 0
 20024  20025  20026 -952 -20028 0
 20024  20025  20026 -952  20029 0

c  1+1 --> 2
c    (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0 ∧  p_952) -> (-b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0)
c  in CNF:
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_2
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨  b^{119, 9}_1
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ -p_952 ∨ -b^{119, 9}_0
c  in DIMACS:
 20024  20025 -20026 -952 -20027 0
 20024  20025 -20026 -952  20028 0
 20024  20025 -20026 -952 -20029 0

c  2+1 --> break 
c    (-b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧  p_952) -> break
c  in CNF:
c     b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 20024 -20025  20026 -952 1162 0


c  2-1 --> 1
c    (-b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧ -p_952) -> (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0)
c  in CNF:
c     b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_2
c     b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_1
c     b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨  b^{119, 9}_0
c  in DIMACS:
 20024 -20025  20026  952 -20027 0
 20024 -20025  20026  952 -20028 0
 20024 -20025  20026  952  20029 0

c  1-1 --> 0
c    (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0 ∧ -p_952) -> (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧ -b^{119, 9}_0)
c  in CNF:
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_2
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_1
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_0
c  in DIMACS:
 20024  20025 -20026  952 -20027 0
 20024  20025 -20026  952 -20028 0
 20024  20025 -20026  952 -20029 0

c  0-1 --> -1
c    (-b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧ -p_952) -> ( b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0)
c  in CNF:
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨  b^{119, 9}_2
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_1
c     b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨  b^{119, 9}_0
c  in DIMACS:
 20024  20025  20026  952  20027 0
 20024  20025  20026  952 -20028 0
 20024  20025  20026  952  20029 0

c  -1-1 --> -2
c    ( b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧  b^{119, 8}_0 ∧ -p_952) -> ( b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0)
c  in CNF:
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨  b^{119, 9}_2
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨  b^{119, 9}_1
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨  p_952 ∨ -b^{119, 9}_0
c  in DIMACS:
-20024  20025 -20026  952  20027 0
-20024  20025 -20026  952  20028 0
-20024  20025 -20026  952 -20029 0

c  -2-1 --> break 
c    ( b^{119, 8}_2 ∧  b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨  b^{119, 8}_0 ∨  p_952 ∨ break
c  in DIMACS:
-20024 -20025  20026  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 8}_2 ∧ -b^{119, 8}_1 ∧ -b^{119, 8}_0 ∧ true) 
c  in CNF:
c    -b^{119, 8}_2 ∨  b^{119, 8}_1 ∨  b^{119, 8}_0 ∨ false 
c  in DIMACS:
-20024  20025  20026  0

c  3 does not represent an automaton state.
c    -(-b^{119, 8}_2 ∧  b^{119, 8}_1 ∧  b^{119, 8}_0 ∧ true) 
c  in CNF:
c     b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ false 
c  in DIMACS:
 20024 -20025 -20026  0
c  -3 does not represent an automaton state.
c    -( b^{119, 8}_2 ∧  b^{119, 8}_1 ∧  b^{119, 8}_0 ∧ true) 
c  in CNF:
c    -b^{119, 8}_2 ∨ -b^{119, 8}_1 ∨ -b^{119, 8}_0 ∨ false 
c  in DIMACS:
-20024 -20025 -20026  0

c i = 9
c  -2+1 --> -1
c    ( b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧  p_1071) -> ( b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧  b^{119, 10}_0)
c  in CNF:
c    -b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨  b^{119, 10}_2
c    -b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_1
c    -b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨  b^{119, 10}_0
c  in DIMACS:
-20027 -20028  20029 -1071  20030 0
-20027 -20028  20029 -1071 -20031 0
-20027 -20028  20029 -1071  20032 0

c  -1+1 --> 0
c    ( b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0 ∧  p_1071) -> (-b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧ -b^{119, 10}_0)
c  in CNF:
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_2
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_1
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_0
c  in DIMACS:
-20027  20028 -20029 -1071 -20030 0
-20027  20028 -20029 -1071 -20031 0
-20027  20028 -20029 -1071 -20032 0

c  0+1 --> 1
c    (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧  p_1071) -> (-b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧  b^{119, 10}_0)
c  in CNF:
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_2
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_1
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨  b^{119, 10}_0
c  in DIMACS:
 20027  20028  20029 -1071 -20030 0
 20027  20028  20029 -1071 -20031 0
 20027  20028  20029 -1071  20032 0

c  1+1 --> 2
c    (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0 ∧  p_1071) -> (-b^{119, 10}_2 ∧  b^{119, 10}_1 ∧ -b^{119, 10}_0)
c  in CNF:
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_2
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨  b^{119, 10}_1
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ -p_1071 ∨ -b^{119, 10}_0
c  in DIMACS:
 20027  20028 -20029 -1071 -20030 0
 20027  20028 -20029 -1071  20031 0
 20027  20028 -20029 -1071 -20032 0

c  2+1 --> break 
c    (-b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 20027 -20028  20029 -1071 1162 0


c  2-1 --> 1
c    (-b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧ -p_1071) -> (-b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧  b^{119, 10}_0)
c  in CNF:
c     b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_2
c     b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_1
c     b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨  b^{119, 10}_0
c  in DIMACS:
 20027 -20028  20029  1071 -20030 0
 20027 -20028  20029  1071 -20031 0
 20027 -20028  20029  1071  20032 0

c  1-1 --> 0
c    (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0 ∧ -p_1071) -> (-b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧ -b^{119, 10}_0)
c  in CNF:
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_2
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_1
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_0
c  in DIMACS:
 20027  20028 -20029  1071 -20030 0
 20027  20028 -20029  1071 -20031 0
 20027  20028 -20029  1071 -20032 0

c  0-1 --> -1
c    (-b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧ -p_1071) -> ( b^{119, 10}_2 ∧ -b^{119, 10}_1 ∧  b^{119, 10}_0)
c  in CNF:
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨  b^{119, 10}_2
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_1
c     b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨  b^{119, 10}_0
c  in DIMACS:
 20027  20028  20029  1071  20030 0
 20027  20028  20029  1071 -20031 0
 20027  20028  20029  1071  20032 0

c  -1-1 --> -2
c    ( b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧  b^{119, 9}_0 ∧ -p_1071) -> ( b^{119, 10}_2 ∧  b^{119, 10}_1 ∧ -b^{119, 10}_0)
c  in CNF:
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨  b^{119, 10}_2
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨  b^{119, 10}_1
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨  p_1071 ∨ -b^{119, 10}_0
c  in DIMACS:
-20027  20028 -20029  1071  20030 0
-20027  20028 -20029  1071  20031 0
-20027  20028 -20029  1071 -20032 0

c  -2-1 --> break 
c    ( b^{119, 9}_2 ∧  b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨  b^{119, 9}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-20027 -20028  20029  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{119, 9}_2 ∧ -b^{119, 9}_1 ∧ -b^{119, 9}_0 ∧ true) 
c  in CNF:
c    -b^{119, 9}_2 ∨  b^{119, 9}_1 ∨  b^{119, 9}_0 ∨ false 
c  in DIMACS:
-20027  20028  20029  0

c  3 does not represent an automaton state.
c    -(-b^{119, 9}_2 ∧  b^{119, 9}_1 ∧  b^{119, 9}_0 ∧ true) 
c  in CNF:
c     b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ false 
c  in DIMACS:
 20027 -20028 -20029  0
c  -3 does not represent an automaton state.
c    -( b^{119, 9}_2 ∧  b^{119, 9}_1 ∧  b^{119, 9}_0 ∧ true) 
c  in CNF:
c    -b^{119, 9}_2 ∨ -b^{119, 9}_1 ∨ -b^{119, 9}_0 ∨ false 
c  in DIMACS:
-20027 -20028 -20029  0

c INIT for k = 120
c    -b^{120, 1}_2
c    -b^{120, 1}_1
c    -b^{120, 1}_0
c  in DIMACS:
-20033 0
-20034 0
-20035 0

c Transitions for k = 120
c i = 1
c  -2+1 --> -1
c    ( b^{120, 1}_2 ∧  b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧  p_120) -> ( b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0)
c  in CNF:
c    -b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨  b^{120, 2}_2
c    -b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_1
c    -b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨  b^{120, 2}_0
c  in DIMACS:
-20033 -20034  20035 -120  20036 0
-20033 -20034  20035 -120 -20037 0
-20033 -20034  20035 -120  20038 0

c  -1+1 --> 0
c    ( b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧  b^{120, 1}_0 ∧  p_120) -> (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧ -b^{120, 2}_0)
c  in CNF:
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_2
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_1
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_0
c  in DIMACS:
-20033  20034 -20035 -120 -20036 0
-20033  20034 -20035 -120 -20037 0
-20033  20034 -20035 -120 -20038 0

c  0+1 --> 1
c    (-b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧  p_120) -> (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0)
c  in CNF:
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_2
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_1
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨  b^{120, 2}_0
c  in DIMACS:
 20033  20034  20035 -120 -20036 0
 20033  20034  20035 -120 -20037 0
 20033  20034  20035 -120  20038 0

c  1+1 --> 2
c    (-b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧  b^{120, 1}_0 ∧  p_120) -> (-b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0)
c  in CNF:
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_2
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨  b^{120, 2}_1
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ -p_120 ∨ -b^{120, 2}_0
c  in DIMACS:
 20033  20034 -20035 -120 -20036 0
 20033  20034 -20035 -120  20037 0
 20033  20034 -20035 -120 -20038 0

c  2+1 --> break 
c    (-b^{120, 1}_2 ∧  b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧  p_120) -> break
c  in CNF:
c     b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ -p_120 ∨ break
c  in DIMACS:
 20033 -20034  20035 -120 1162 0


c  2-1 --> 1
c    (-b^{120, 1}_2 ∧  b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧ -p_120) -> (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0)
c  in CNF:
c     b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_2
c     b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_1
c     b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨  b^{120, 2}_0
c  in DIMACS:
 20033 -20034  20035  120 -20036 0
 20033 -20034  20035  120 -20037 0
 20033 -20034  20035  120  20038 0

c  1-1 --> 0
c    (-b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧  b^{120, 1}_0 ∧ -p_120) -> (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧ -b^{120, 2}_0)
c  in CNF:
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_2
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_1
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_0
c  in DIMACS:
 20033  20034 -20035  120 -20036 0
 20033  20034 -20035  120 -20037 0
 20033  20034 -20035  120 -20038 0

c  0-1 --> -1
c    (-b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧ -p_120) -> ( b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0)
c  in CNF:
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨  b^{120, 2}_2
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_1
c     b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨  b^{120, 2}_0
c  in DIMACS:
 20033  20034  20035  120  20036 0
 20033  20034  20035  120 -20037 0
 20033  20034  20035  120  20038 0

c  -1-1 --> -2
c    ( b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧  b^{120, 1}_0 ∧ -p_120) -> ( b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0)
c  in CNF:
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨  b^{120, 2}_2
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨  b^{120, 2}_1
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨  p_120 ∨ -b^{120, 2}_0
c  in DIMACS:
-20033  20034 -20035  120  20036 0
-20033  20034 -20035  120  20037 0
-20033  20034 -20035  120 -20038 0

c  -2-1 --> break 
c    ( b^{120, 1}_2 ∧  b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧ -p_120) -> break
c  in CNF:
c    -b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨  b^{120, 1}_0 ∨  p_120 ∨ break
c  in DIMACS:
-20033 -20034  20035  120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 1}_2 ∧ -b^{120, 1}_1 ∧ -b^{120, 1}_0 ∧ true) 
c  in CNF:
c    -b^{120, 1}_2 ∨  b^{120, 1}_1 ∨  b^{120, 1}_0 ∨ false 
c  in DIMACS:
-20033  20034  20035  0

c  3 does not represent an automaton state.
c    -(-b^{120, 1}_2 ∧  b^{120, 1}_1 ∧  b^{120, 1}_0 ∧ true) 
c  in CNF:
c     b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ false 
c  in DIMACS:
 20033 -20034 -20035  0
c  -3 does not represent an automaton state.
c    -( b^{120, 1}_2 ∧  b^{120, 1}_1 ∧  b^{120, 1}_0 ∧ true) 
c  in CNF:
c    -b^{120, 1}_2 ∨ -b^{120, 1}_1 ∨ -b^{120, 1}_0 ∨ false 
c  in DIMACS:
-20033 -20034 -20035  0

c i = 2
c  -2+1 --> -1
c    ( b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧  p_240) -> ( b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0)
c  in CNF:
c    -b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨  b^{120, 3}_2
c    -b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_1
c    -b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨  b^{120, 3}_0
c  in DIMACS:
-20036 -20037  20038 -240  20039 0
-20036 -20037  20038 -240 -20040 0
-20036 -20037  20038 -240  20041 0

c  -1+1 --> 0
c    ( b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0 ∧  p_240) -> (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧ -b^{120, 3}_0)
c  in CNF:
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_2
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_1
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_0
c  in DIMACS:
-20036  20037 -20038 -240 -20039 0
-20036  20037 -20038 -240 -20040 0
-20036  20037 -20038 -240 -20041 0

c  0+1 --> 1
c    (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧  p_240) -> (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0)
c  in CNF:
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_2
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_1
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨  b^{120, 3}_0
c  in DIMACS:
 20036  20037  20038 -240 -20039 0
 20036  20037  20038 -240 -20040 0
 20036  20037  20038 -240  20041 0

c  1+1 --> 2
c    (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0 ∧  p_240) -> (-b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0)
c  in CNF:
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_2
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨  b^{120, 3}_1
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ -p_240 ∨ -b^{120, 3}_0
c  in DIMACS:
 20036  20037 -20038 -240 -20039 0
 20036  20037 -20038 -240  20040 0
 20036  20037 -20038 -240 -20041 0

c  2+1 --> break 
c    (-b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧  p_240) -> break
c  in CNF:
c     b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 20036 -20037  20038 -240 1162 0


c  2-1 --> 1
c    (-b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧ -p_240) -> (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0)
c  in CNF:
c     b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_2
c     b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_1
c     b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨  b^{120, 3}_0
c  in DIMACS:
 20036 -20037  20038  240 -20039 0
 20036 -20037  20038  240 -20040 0
 20036 -20037  20038  240  20041 0

c  1-1 --> 0
c    (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0 ∧ -p_240) -> (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧ -b^{120, 3}_0)
c  in CNF:
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_2
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_1
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_0
c  in DIMACS:
 20036  20037 -20038  240 -20039 0
 20036  20037 -20038  240 -20040 0
 20036  20037 -20038  240 -20041 0

c  0-1 --> -1
c    (-b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧ -p_240) -> ( b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0)
c  in CNF:
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨  b^{120, 3}_2
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_1
c     b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨  b^{120, 3}_0
c  in DIMACS:
 20036  20037  20038  240  20039 0
 20036  20037  20038  240 -20040 0
 20036  20037  20038  240  20041 0

c  -1-1 --> -2
c    ( b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧  b^{120, 2}_0 ∧ -p_240) -> ( b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0)
c  in CNF:
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨  b^{120, 3}_2
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨  b^{120, 3}_1
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨  p_240 ∨ -b^{120, 3}_0
c  in DIMACS:
-20036  20037 -20038  240  20039 0
-20036  20037 -20038  240  20040 0
-20036  20037 -20038  240 -20041 0

c  -2-1 --> break 
c    ( b^{120, 2}_2 ∧  b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨  b^{120, 2}_0 ∨  p_240 ∨ break
c  in DIMACS:
-20036 -20037  20038  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 2}_2 ∧ -b^{120, 2}_1 ∧ -b^{120, 2}_0 ∧ true) 
c  in CNF:
c    -b^{120, 2}_2 ∨  b^{120, 2}_1 ∨  b^{120, 2}_0 ∨ false 
c  in DIMACS:
-20036  20037  20038  0

c  3 does not represent an automaton state.
c    -(-b^{120, 2}_2 ∧  b^{120, 2}_1 ∧  b^{120, 2}_0 ∧ true) 
c  in CNF:
c     b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ false 
c  in DIMACS:
 20036 -20037 -20038  0
c  -3 does not represent an automaton state.
c    -( b^{120, 2}_2 ∧  b^{120, 2}_1 ∧  b^{120, 2}_0 ∧ true) 
c  in CNF:
c    -b^{120, 2}_2 ∨ -b^{120, 2}_1 ∨ -b^{120, 2}_0 ∨ false 
c  in DIMACS:
-20036 -20037 -20038  0

c i = 3
c  -2+1 --> -1
c    ( b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧  p_360) -> ( b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0)
c  in CNF:
c    -b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨  b^{120, 4}_2
c    -b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_1
c    -b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨  b^{120, 4}_0
c  in DIMACS:
-20039 -20040  20041 -360  20042 0
-20039 -20040  20041 -360 -20043 0
-20039 -20040  20041 -360  20044 0

c  -1+1 --> 0
c    ( b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0 ∧  p_360) -> (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧ -b^{120, 4}_0)
c  in CNF:
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_2
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_1
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_0
c  in DIMACS:
-20039  20040 -20041 -360 -20042 0
-20039  20040 -20041 -360 -20043 0
-20039  20040 -20041 -360 -20044 0

c  0+1 --> 1
c    (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧  p_360) -> (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0)
c  in CNF:
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_2
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_1
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨  b^{120, 4}_0
c  in DIMACS:
 20039  20040  20041 -360 -20042 0
 20039  20040  20041 -360 -20043 0
 20039  20040  20041 -360  20044 0

c  1+1 --> 2
c    (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0 ∧  p_360) -> (-b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0)
c  in CNF:
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_2
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨  b^{120, 4}_1
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ -p_360 ∨ -b^{120, 4}_0
c  in DIMACS:
 20039  20040 -20041 -360 -20042 0
 20039  20040 -20041 -360  20043 0
 20039  20040 -20041 -360 -20044 0

c  2+1 --> break 
c    (-b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧  p_360) -> break
c  in CNF:
c     b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 20039 -20040  20041 -360 1162 0


c  2-1 --> 1
c    (-b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧ -p_360) -> (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0)
c  in CNF:
c     b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_2
c     b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_1
c     b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨  b^{120, 4}_0
c  in DIMACS:
 20039 -20040  20041  360 -20042 0
 20039 -20040  20041  360 -20043 0
 20039 -20040  20041  360  20044 0

c  1-1 --> 0
c    (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0 ∧ -p_360) -> (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧ -b^{120, 4}_0)
c  in CNF:
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_2
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_1
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_0
c  in DIMACS:
 20039  20040 -20041  360 -20042 0
 20039  20040 -20041  360 -20043 0
 20039  20040 -20041  360 -20044 0

c  0-1 --> -1
c    (-b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧ -p_360) -> ( b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0)
c  in CNF:
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨  b^{120, 4}_2
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_1
c     b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨  b^{120, 4}_0
c  in DIMACS:
 20039  20040  20041  360  20042 0
 20039  20040  20041  360 -20043 0
 20039  20040  20041  360  20044 0

c  -1-1 --> -2
c    ( b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧  b^{120, 3}_0 ∧ -p_360) -> ( b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0)
c  in CNF:
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨  b^{120, 4}_2
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨  b^{120, 4}_1
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨  p_360 ∨ -b^{120, 4}_0
c  in DIMACS:
-20039  20040 -20041  360  20042 0
-20039  20040 -20041  360  20043 0
-20039  20040 -20041  360 -20044 0

c  -2-1 --> break 
c    ( b^{120, 3}_2 ∧  b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨  b^{120, 3}_0 ∨  p_360 ∨ break
c  in DIMACS:
-20039 -20040  20041  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 3}_2 ∧ -b^{120, 3}_1 ∧ -b^{120, 3}_0 ∧ true) 
c  in CNF:
c    -b^{120, 3}_2 ∨  b^{120, 3}_1 ∨  b^{120, 3}_0 ∨ false 
c  in DIMACS:
-20039  20040  20041  0

c  3 does not represent an automaton state.
c    -(-b^{120, 3}_2 ∧  b^{120, 3}_1 ∧  b^{120, 3}_0 ∧ true) 
c  in CNF:
c     b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ false 
c  in DIMACS:
 20039 -20040 -20041  0
c  -3 does not represent an automaton state.
c    -( b^{120, 3}_2 ∧  b^{120, 3}_1 ∧  b^{120, 3}_0 ∧ true) 
c  in CNF:
c    -b^{120, 3}_2 ∨ -b^{120, 3}_1 ∨ -b^{120, 3}_0 ∨ false 
c  in DIMACS:
-20039 -20040 -20041  0

c i = 4
c  -2+1 --> -1
c    ( b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧  p_480) -> ( b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0)
c  in CNF:
c    -b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨  b^{120, 5}_2
c    -b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_1
c    -b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨  b^{120, 5}_0
c  in DIMACS:
-20042 -20043  20044 -480  20045 0
-20042 -20043  20044 -480 -20046 0
-20042 -20043  20044 -480  20047 0

c  -1+1 --> 0
c    ( b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0 ∧  p_480) -> (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧ -b^{120, 5}_0)
c  in CNF:
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_2
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_1
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_0
c  in DIMACS:
-20042  20043 -20044 -480 -20045 0
-20042  20043 -20044 -480 -20046 0
-20042  20043 -20044 -480 -20047 0

c  0+1 --> 1
c    (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧  p_480) -> (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0)
c  in CNF:
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_2
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_1
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨  b^{120, 5}_0
c  in DIMACS:
 20042  20043  20044 -480 -20045 0
 20042  20043  20044 -480 -20046 0
 20042  20043  20044 -480  20047 0

c  1+1 --> 2
c    (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0 ∧  p_480) -> (-b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0)
c  in CNF:
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_2
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨  b^{120, 5}_1
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ -p_480 ∨ -b^{120, 5}_0
c  in DIMACS:
 20042  20043 -20044 -480 -20045 0
 20042  20043 -20044 -480  20046 0
 20042  20043 -20044 -480 -20047 0

c  2+1 --> break 
c    (-b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧  p_480) -> break
c  in CNF:
c     b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 20042 -20043  20044 -480 1162 0


c  2-1 --> 1
c    (-b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧ -p_480) -> (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0)
c  in CNF:
c     b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_2
c     b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_1
c     b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨  b^{120, 5}_0
c  in DIMACS:
 20042 -20043  20044  480 -20045 0
 20042 -20043  20044  480 -20046 0
 20042 -20043  20044  480  20047 0

c  1-1 --> 0
c    (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0 ∧ -p_480) -> (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧ -b^{120, 5}_0)
c  in CNF:
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_2
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_1
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_0
c  in DIMACS:
 20042  20043 -20044  480 -20045 0
 20042  20043 -20044  480 -20046 0
 20042  20043 -20044  480 -20047 0

c  0-1 --> -1
c    (-b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧ -p_480) -> ( b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0)
c  in CNF:
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨  b^{120, 5}_2
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_1
c     b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨  b^{120, 5}_0
c  in DIMACS:
 20042  20043  20044  480  20045 0
 20042  20043  20044  480 -20046 0
 20042  20043  20044  480  20047 0

c  -1-1 --> -2
c    ( b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧  b^{120, 4}_0 ∧ -p_480) -> ( b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0)
c  in CNF:
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨  b^{120, 5}_2
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨  b^{120, 5}_1
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨  p_480 ∨ -b^{120, 5}_0
c  in DIMACS:
-20042  20043 -20044  480  20045 0
-20042  20043 -20044  480  20046 0
-20042  20043 -20044  480 -20047 0

c  -2-1 --> break 
c    ( b^{120, 4}_2 ∧  b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨  b^{120, 4}_0 ∨  p_480 ∨ break
c  in DIMACS:
-20042 -20043  20044  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 4}_2 ∧ -b^{120, 4}_1 ∧ -b^{120, 4}_0 ∧ true) 
c  in CNF:
c    -b^{120, 4}_2 ∨  b^{120, 4}_1 ∨  b^{120, 4}_0 ∨ false 
c  in DIMACS:
-20042  20043  20044  0

c  3 does not represent an automaton state.
c    -(-b^{120, 4}_2 ∧  b^{120, 4}_1 ∧  b^{120, 4}_0 ∧ true) 
c  in CNF:
c     b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ false 
c  in DIMACS:
 20042 -20043 -20044  0
c  -3 does not represent an automaton state.
c    -( b^{120, 4}_2 ∧  b^{120, 4}_1 ∧  b^{120, 4}_0 ∧ true) 
c  in CNF:
c    -b^{120, 4}_2 ∨ -b^{120, 4}_1 ∨ -b^{120, 4}_0 ∨ false 
c  in DIMACS:
-20042 -20043 -20044  0

c i = 5
c  -2+1 --> -1
c    ( b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧  p_600) -> ( b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0)
c  in CNF:
c    -b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨  b^{120, 6}_2
c    -b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_1
c    -b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨  b^{120, 6}_0
c  in DIMACS:
-20045 -20046  20047 -600  20048 0
-20045 -20046  20047 -600 -20049 0
-20045 -20046  20047 -600  20050 0

c  -1+1 --> 0
c    ( b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0 ∧  p_600) -> (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧ -b^{120, 6}_0)
c  in CNF:
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_2
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_1
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_0
c  in DIMACS:
-20045  20046 -20047 -600 -20048 0
-20045  20046 -20047 -600 -20049 0
-20045  20046 -20047 -600 -20050 0

c  0+1 --> 1
c    (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧  p_600) -> (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0)
c  in CNF:
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_2
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_1
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨  b^{120, 6}_0
c  in DIMACS:
 20045  20046  20047 -600 -20048 0
 20045  20046  20047 -600 -20049 0
 20045  20046  20047 -600  20050 0

c  1+1 --> 2
c    (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0 ∧  p_600) -> (-b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0)
c  in CNF:
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_2
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨  b^{120, 6}_1
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ -p_600 ∨ -b^{120, 6}_0
c  in DIMACS:
 20045  20046 -20047 -600 -20048 0
 20045  20046 -20047 -600  20049 0
 20045  20046 -20047 -600 -20050 0

c  2+1 --> break 
c    (-b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧  p_600) -> break
c  in CNF:
c     b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 20045 -20046  20047 -600 1162 0


c  2-1 --> 1
c    (-b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧ -p_600) -> (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0)
c  in CNF:
c     b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_2
c     b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_1
c     b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨  b^{120, 6}_0
c  in DIMACS:
 20045 -20046  20047  600 -20048 0
 20045 -20046  20047  600 -20049 0
 20045 -20046  20047  600  20050 0

c  1-1 --> 0
c    (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0 ∧ -p_600) -> (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧ -b^{120, 6}_0)
c  in CNF:
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_2
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_1
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_0
c  in DIMACS:
 20045  20046 -20047  600 -20048 0
 20045  20046 -20047  600 -20049 0
 20045  20046 -20047  600 -20050 0

c  0-1 --> -1
c    (-b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧ -p_600) -> ( b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0)
c  in CNF:
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨  b^{120, 6}_2
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_1
c     b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨  b^{120, 6}_0
c  in DIMACS:
 20045  20046  20047  600  20048 0
 20045  20046  20047  600 -20049 0
 20045  20046  20047  600  20050 0

c  -1-1 --> -2
c    ( b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧  b^{120, 5}_0 ∧ -p_600) -> ( b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0)
c  in CNF:
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨  b^{120, 6}_2
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨  b^{120, 6}_1
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨  p_600 ∨ -b^{120, 6}_0
c  in DIMACS:
-20045  20046 -20047  600  20048 0
-20045  20046 -20047  600  20049 0
-20045  20046 -20047  600 -20050 0

c  -2-1 --> break 
c    ( b^{120, 5}_2 ∧  b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨  b^{120, 5}_0 ∨  p_600 ∨ break
c  in DIMACS:
-20045 -20046  20047  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 5}_2 ∧ -b^{120, 5}_1 ∧ -b^{120, 5}_0 ∧ true) 
c  in CNF:
c    -b^{120, 5}_2 ∨  b^{120, 5}_1 ∨  b^{120, 5}_0 ∨ false 
c  in DIMACS:
-20045  20046  20047  0

c  3 does not represent an automaton state.
c    -(-b^{120, 5}_2 ∧  b^{120, 5}_1 ∧  b^{120, 5}_0 ∧ true) 
c  in CNF:
c     b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ false 
c  in DIMACS:
 20045 -20046 -20047  0
c  -3 does not represent an automaton state.
c    -( b^{120, 5}_2 ∧  b^{120, 5}_1 ∧  b^{120, 5}_0 ∧ true) 
c  in CNF:
c    -b^{120, 5}_2 ∨ -b^{120, 5}_1 ∨ -b^{120, 5}_0 ∨ false 
c  in DIMACS:
-20045 -20046 -20047  0

c i = 6
c  -2+1 --> -1
c    ( b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧  p_720) -> ( b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0)
c  in CNF:
c    -b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨  b^{120, 7}_2
c    -b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_1
c    -b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨  b^{120, 7}_0
c  in DIMACS:
-20048 -20049  20050 -720  20051 0
-20048 -20049  20050 -720 -20052 0
-20048 -20049  20050 -720  20053 0

c  -1+1 --> 0
c    ( b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0 ∧  p_720) -> (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧ -b^{120, 7}_0)
c  in CNF:
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_2
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_1
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_0
c  in DIMACS:
-20048  20049 -20050 -720 -20051 0
-20048  20049 -20050 -720 -20052 0
-20048  20049 -20050 -720 -20053 0

c  0+1 --> 1
c    (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧  p_720) -> (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0)
c  in CNF:
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_2
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_1
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨  b^{120, 7}_0
c  in DIMACS:
 20048  20049  20050 -720 -20051 0
 20048  20049  20050 -720 -20052 0
 20048  20049  20050 -720  20053 0

c  1+1 --> 2
c    (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0 ∧  p_720) -> (-b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0)
c  in CNF:
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_2
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨  b^{120, 7}_1
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ -p_720 ∨ -b^{120, 7}_0
c  in DIMACS:
 20048  20049 -20050 -720 -20051 0
 20048  20049 -20050 -720  20052 0
 20048  20049 -20050 -720 -20053 0

c  2+1 --> break 
c    (-b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧  p_720) -> break
c  in CNF:
c     b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 20048 -20049  20050 -720 1162 0


c  2-1 --> 1
c    (-b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧ -p_720) -> (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0)
c  in CNF:
c     b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_2
c     b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_1
c     b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨  b^{120, 7}_0
c  in DIMACS:
 20048 -20049  20050  720 -20051 0
 20048 -20049  20050  720 -20052 0
 20048 -20049  20050  720  20053 0

c  1-1 --> 0
c    (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0 ∧ -p_720) -> (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧ -b^{120, 7}_0)
c  in CNF:
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_2
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_1
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_0
c  in DIMACS:
 20048  20049 -20050  720 -20051 0
 20048  20049 -20050  720 -20052 0
 20048  20049 -20050  720 -20053 0

c  0-1 --> -1
c    (-b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧ -p_720) -> ( b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0)
c  in CNF:
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨  b^{120, 7}_2
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_1
c     b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨  b^{120, 7}_0
c  in DIMACS:
 20048  20049  20050  720  20051 0
 20048  20049  20050  720 -20052 0
 20048  20049  20050  720  20053 0

c  -1-1 --> -2
c    ( b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧  b^{120, 6}_0 ∧ -p_720) -> ( b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0)
c  in CNF:
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨  b^{120, 7}_2
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨  b^{120, 7}_1
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨  p_720 ∨ -b^{120, 7}_0
c  in DIMACS:
-20048  20049 -20050  720  20051 0
-20048  20049 -20050  720  20052 0
-20048  20049 -20050  720 -20053 0

c  -2-1 --> break 
c    ( b^{120, 6}_2 ∧  b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨  b^{120, 6}_0 ∨  p_720 ∨ break
c  in DIMACS:
-20048 -20049  20050  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 6}_2 ∧ -b^{120, 6}_1 ∧ -b^{120, 6}_0 ∧ true) 
c  in CNF:
c    -b^{120, 6}_2 ∨  b^{120, 6}_1 ∨  b^{120, 6}_0 ∨ false 
c  in DIMACS:
-20048  20049  20050  0

c  3 does not represent an automaton state.
c    -(-b^{120, 6}_2 ∧  b^{120, 6}_1 ∧  b^{120, 6}_0 ∧ true) 
c  in CNF:
c     b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ false 
c  in DIMACS:
 20048 -20049 -20050  0
c  -3 does not represent an automaton state.
c    -( b^{120, 6}_2 ∧  b^{120, 6}_1 ∧  b^{120, 6}_0 ∧ true) 
c  in CNF:
c    -b^{120, 6}_2 ∨ -b^{120, 6}_1 ∨ -b^{120, 6}_0 ∨ false 
c  in DIMACS:
-20048 -20049 -20050  0

c i = 7
c  -2+1 --> -1
c    ( b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧  p_840) -> ( b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0)
c  in CNF:
c    -b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨  b^{120, 8}_2
c    -b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_1
c    -b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨  b^{120, 8}_0
c  in DIMACS:
-20051 -20052  20053 -840  20054 0
-20051 -20052  20053 -840 -20055 0
-20051 -20052  20053 -840  20056 0

c  -1+1 --> 0
c    ( b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0 ∧  p_840) -> (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧ -b^{120, 8}_0)
c  in CNF:
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_2
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_1
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_0
c  in DIMACS:
-20051  20052 -20053 -840 -20054 0
-20051  20052 -20053 -840 -20055 0
-20051  20052 -20053 -840 -20056 0

c  0+1 --> 1
c    (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧  p_840) -> (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0)
c  in CNF:
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_2
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_1
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨  b^{120, 8}_0
c  in DIMACS:
 20051  20052  20053 -840 -20054 0
 20051  20052  20053 -840 -20055 0
 20051  20052  20053 -840  20056 0

c  1+1 --> 2
c    (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0 ∧  p_840) -> (-b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0)
c  in CNF:
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_2
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨  b^{120, 8}_1
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ -p_840 ∨ -b^{120, 8}_0
c  in DIMACS:
 20051  20052 -20053 -840 -20054 0
 20051  20052 -20053 -840  20055 0
 20051  20052 -20053 -840 -20056 0

c  2+1 --> break 
c    (-b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧  p_840) -> break
c  in CNF:
c     b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 20051 -20052  20053 -840 1162 0


c  2-1 --> 1
c    (-b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧ -p_840) -> (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0)
c  in CNF:
c     b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_2
c     b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_1
c     b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨  b^{120, 8}_0
c  in DIMACS:
 20051 -20052  20053  840 -20054 0
 20051 -20052  20053  840 -20055 0
 20051 -20052  20053  840  20056 0

c  1-1 --> 0
c    (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0 ∧ -p_840) -> (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧ -b^{120, 8}_0)
c  in CNF:
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_2
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_1
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_0
c  in DIMACS:
 20051  20052 -20053  840 -20054 0
 20051  20052 -20053  840 -20055 0
 20051  20052 -20053  840 -20056 0

c  0-1 --> -1
c    (-b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧ -p_840) -> ( b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0)
c  in CNF:
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨  b^{120, 8}_2
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_1
c     b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨  b^{120, 8}_0
c  in DIMACS:
 20051  20052  20053  840  20054 0
 20051  20052  20053  840 -20055 0
 20051  20052  20053  840  20056 0

c  -1-1 --> -2
c    ( b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧  b^{120, 7}_0 ∧ -p_840) -> ( b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0)
c  in CNF:
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨  b^{120, 8}_2
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨  b^{120, 8}_1
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨  p_840 ∨ -b^{120, 8}_0
c  in DIMACS:
-20051  20052 -20053  840  20054 0
-20051  20052 -20053  840  20055 0
-20051  20052 -20053  840 -20056 0

c  -2-1 --> break 
c    ( b^{120, 7}_2 ∧  b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨  b^{120, 7}_0 ∨  p_840 ∨ break
c  in DIMACS:
-20051 -20052  20053  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 7}_2 ∧ -b^{120, 7}_1 ∧ -b^{120, 7}_0 ∧ true) 
c  in CNF:
c    -b^{120, 7}_2 ∨  b^{120, 7}_1 ∨  b^{120, 7}_0 ∨ false 
c  in DIMACS:
-20051  20052  20053  0

c  3 does not represent an automaton state.
c    -(-b^{120, 7}_2 ∧  b^{120, 7}_1 ∧  b^{120, 7}_0 ∧ true) 
c  in CNF:
c     b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ false 
c  in DIMACS:
 20051 -20052 -20053  0
c  -3 does not represent an automaton state.
c    -( b^{120, 7}_2 ∧  b^{120, 7}_1 ∧  b^{120, 7}_0 ∧ true) 
c  in CNF:
c    -b^{120, 7}_2 ∨ -b^{120, 7}_1 ∨ -b^{120, 7}_0 ∨ false 
c  in DIMACS:
-20051 -20052 -20053  0

c i = 8
c  -2+1 --> -1
c    ( b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧  p_960) -> ( b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0)
c  in CNF:
c    -b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨  b^{120, 9}_2
c    -b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_1
c    -b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨  b^{120, 9}_0
c  in DIMACS:
-20054 -20055  20056 -960  20057 0
-20054 -20055  20056 -960 -20058 0
-20054 -20055  20056 -960  20059 0

c  -1+1 --> 0
c    ( b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0 ∧  p_960) -> (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧ -b^{120, 9}_0)
c  in CNF:
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_2
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_1
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_0
c  in DIMACS:
-20054  20055 -20056 -960 -20057 0
-20054  20055 -20056 -960 -20058 0
-20054  20055 -20056 -960 -20059 0

c  0+1 --> 1
c    (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧  p_960) -> (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0)
c  in CNF:
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_2
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_1
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨  b^{120, 9}_0
c  in DIMACS:
 20054  20055  20056 -960 -20057 0
 20054  20055  20056 -960 -20058 0
 20054  20055  20056 -960  20059 0

c  1+1 --> 2
c    (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0 ∧  p_960) -> (-b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0)
c  in CNF:
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_2
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨  b^{120, 9}_1
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ -p_960 ∨ -b^{120, 9}_0
c  in DIMACS:
 20054  20055 -20056 -960 -20057 0
 20054  20055 -20056 -960  20058 0
 20054  20055 -20056 -960 -20059 0

c  2+1 --> break 
c    (-b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧  p_960) -> break
c  in CNF:
c     b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 20054 -20055  20056 -960 1162 0


c  2-1 --> 1
c    (-b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧ -p_960) -> (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0)
c  in CNF:
c     b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_2
c     b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_1
c     b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨  b^{120, 9}_0
c  in DIMACS:
 20054 -20055  20056  960 -20057 0
 20054 -20055  20056  960 -20058 0
 20054 -20055  20056  960  20059 0

c  1-1 --> 0
c    (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0 ∧ -p_960) -> (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧ -b^{120, 9}_0)
c  in CNF:
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_2
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_1
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_0
c  in DIMACS:
 20054  20055 -20056  960 -20057 0
 20054  20055 -20056  960 -20058 0
 20054  20055 -20056  960 -20059 0

c  0-1 --> -1
c    (-b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧ -p_960) -> ( b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0)
c  in CNF:
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨  b^{120, 9}_2
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_1
c     b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨  b^{120, 9}_0
c  in DIMACS:
 20054  20055  20056  960  20057 0
 20054  20055  20056  960 -20058 0
 20054  20055  20056  960  20059 0

c  -1-1 --> -2
c    ( b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧  b^{120, 8}_0 ∧ -p_960) -> ( b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0)
c  in CNF:
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨  b^{120, 9}_2
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨  b^{120, 9}_1
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨  p_960 ∨ -b^{120, 9}_0
c  in DIMACS:
-20054  20055 -20056  960  20057 0
-20054  20055 -20056  960  20058 0
-20054  20055 -20056  960 -20059 0

c  -2-1 --> break 
c    ( b^{120, 8}_2 ∧  b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨  b^{120, 8}_0 ∨  p_960 ∨ break
c  in DIMACS:
-20054 -20055  20056  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 8}_2 ∧ -b^{120, 8}_1 ∧ -b^{120, 8}_0 ∧ true) 
c  in CNF:
c    -b^{120, 8}_2 ∨  b^{120, 8}_1 ∨  b^{120, 8}_0 ∨ false 
c  in DIMACS:
-20054  20055  20056  0

c  3 does not represent an automaton state.
c    -(-b^{120, 8}_2 ∧  b^{120, 8}_1 ∧  b^{120, 8}_0 ∧ true) 
c  in CNF:
c     b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ false 
c  in DIMACS:
 20054 -20055 -20056  0
c  -3 does not represent an automaton state.
c    -( b^{120, 8}_2 ∧  b^{120, 8}_1 ∧  b^{120, 8}_0 ∧ true) 
c  in CNF:
c    -b^{120, 8}_2 ∨ -b^{120, 8}_1 ∨ -b^{120, 8}_0 ∨ false 
c  in DIMACS:
-20054 -20055 -20056  0

c i = 9
c  -2+1 --> -1
c    ( b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧  p_1080) -> ( b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧  b^{120, 10}_0)
c  in CNF:
c    -b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨  b^{120, 10}_2
c    -b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_1
c    -b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨  b^{120, 10}_0
c  in DIMACS:
-20057 -20058  20059 -1080  20060 0
-20057 -20058  20059 -1080 -20061 0
-20057 -20058  20059 -1080  20062 0

c  -1+1 --> 0
c    ( b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0 ∧  p_1080) -> (-b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧ -b^{120, 10}_0)
c  in CNF:
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_2
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_1
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_0
c  in DIMACS:
-20057  20058 -20059 -1080 -20060 0
-20057  20058 -20059 -1080 -20061 0
-20057  20058 -20059 -1080 -20062 0

c  0+1 --> 1
c    (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧  p_1080) -> (-b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧  b^{120, 10}_0)
c  in CNF:
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_2
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_1
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨  b^{120, 10}_0
c  in DIMACS:
 20057  20058  20059 -1080 -20060 0
 20057  20058  20059 -1080 -20061 0
 20057  20058  20059 -1080  20062 0

c  1+1 --> 2
c    (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0 ∧  p_1080) -> (-b^{120, 10}_2 ∧  b^{120, 10}_1 ∧ -b^{120, 10}_0)
c  in CNF:
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_2
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨  b^{120, 10}_1
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ -p_1080 ∨ -b^{120, 10}_0
c  in DIMACS:
 20057  20058 -20059 -1080 -20060 0
 20057  20058 -20059 -1080  20061 0
 20057  20058 -20059 -1080 -20062 0

c  2+1 --> break 
c    (-b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 20057 -20058  20059 -1080 1162 0


c  2-1 --> 1
c    (-b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧ -p_1080) -> (-b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧  b^{120, 10}_0)
c  in CNF:
c     b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_2
c     b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_1
c     b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨  b^{120, 10}_0
c  in DIMACS:
 20057 -20058  20059  1080 -20060 0
 20057 -20058  20059  1080 -20061 0
 20057 -20058  20059  1080  20062 0

c  1-1 --> 0
c    (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0 ∧ -p_1080) -> (-b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧ -b^{120, 10}_0)
c  in CNF:
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_2
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_1
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_0
c  in DIMACS:
 20057  20058 -20059  1080 -20060 0
 20057  20058 -20059  1080 -20061 0
 20057  20058 -20059  1080 -20062 0

c  0-1 --> -1
c    (-b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧ -p_1080) -> ( b^{120, 10}_2 ∧ -b^{120, 10}_1 ∧  b^{120, 10}_0)
c  in CNF:
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨  b^{120, 10}_2
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_1
c     b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨  b^{120, 10}_0
c  in DIMACS:
 20057  20058  20059  1080  20060 0
 20057  20058  20059  1080 -20061 0
 20057  20058  20059  1080  20062 0

c  -1-1 --> -2
c    ( b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧  b^{120, 9}_0 ∧ -p_1080) -> ( b^{120, 10}_2 ∧  b^{120, 10}_1 ∧ -b^{120, 10}_0)
c  in CNF:
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨  b^{120, 10}_2
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨  b^{120, 10}_1
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨  p_1080 ∨ -b^{120, 10}_0
c  in DIMACS:
-20057  20058 -20059  1080  20060 0
-20057  20058 -20059  1080  20061 0
-20057  20058 -20059  1080 -20062 0

c  -2-1 --> break 
c    ( b^{120, 9}_2 ∧  b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨  b^{120, 9}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-20057 -20058  20059  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{120, 9}_2 ∧ -b^{120, 9}_1 ∧ -b^{120, 9}_0 ∧ true) 
c  in CNF:
c    -b^{120, 9}_2 ∨  b^{120, 9}_1 ∨  b^{120, 9}_0 ∨ false 
c  in DIMACS:
-20057  20058  20059  0

c  3 does not represent an automaton state.
c    -(-b^{120, 9}_2 ∧  b^{120, 9}_1 ∧  b^{120, 9}_0 ∧ true) 
c  in CNF:
c     b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ false 
c  in DIMACS:
 20057 -20058 -20059  0
c  -3 does not represent an automaton state.
c    -( b^{120, 9}_2 ∧  b^{120, 9}_1 ∧  b^{120, 9}_0 ∧ true) 
c  in CNF:
c    -b^{120, 9}_2 ∨ -b^{120, 9}_1 ∨ -b^{120, 9}_0 ∨ false 
c  in DIMACS:
-20057 -20058 -20059  0

c INIT for k = 121
c    -b^{121, 1}_2
c    -b^{121, 1}_1
c    -b^{121, 1}_0
c  in DIMACS:
-20063 0
-20064 0
-20065 0

c Transitions for k = 121
c i = 1
c  -2+1 --> -1
c    ( b^{121, 1}_2 ∧  b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧  p_121) -> ( b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0)
c  in CNF:
c    -b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨  b^{121, 2}_2
c    -b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_1
c    -b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨  b^{121, 2}_0
c  in DIMACS:
-20063 -20064  20065 -121  20066 0
-20063 -20064  20065 -121 -20067 0
-20063 -20064  20065 -121  20068 0

c  -1+1 --> 0
c    ( b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧  b^{121, 1}_0 ∧  p_121) -> (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧ -b^{121, 2}_0)
c  in CNF:
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_2
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_1
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_0
c  in DIMACS:
-20063  20064 -20065 -121 -20066 0
-20063  20064 -20065 -121 -20067 0
-20063  20064 -20065 -121 -20068 0

c  0+1 --> 1
c    (-b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧  p_121) -> (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0)
c  in CNF:
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_2
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_1
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨  b^{121, 2}_0
c  in DIMACS:
 20063  20064  20065 -121 -20066 0
 20063  20064  20065 -121 -20067 0
 20063  20064  20065 -121  20068 0

c  1+1 --> 2
c    (-b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧  b^{121, 1}_0 ∧  p_121) -> (-b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0)
c  in CNF:
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_2
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨  b^{121, 2}_1
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ -p_121 ∨ -b^{121, 2}_0
c  in DIMACS:
 20063  20064 -20065 -121 -20066 0
 20063  20064 -20065 -121  20067 0
 20063  20064 -20065 -121 -20068 0

c  2+1 --> break 
c    (-b^{121, 1}_2 ∧  b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧  p_121) -> break
c  in CNF:
c     b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ -p_121 ∨ break
c  in DIMACS:
 20063 -20064  20065 -121 1162 0


c  2-1 --> 1
c    (-b^{121, 1}_2 ∧  b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧ -p_121) -> (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0)
c  in CNF:
c     b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_2
c     b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_1
c     b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨  b^{121, 2}_0
c  in DIMACS:
 20063 -20064  20065  121 -20066 0
 20063 -20064  20065  121 -20067 0
 20063 -20064  20065  121  20068 0

c  1-1 --> 0
c    (-b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧  b^{121, 1}_0 ∧ -p_121) -> (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧ -b^{121, 2}_0)
c  in CNF:
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_2
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_1
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_0
c  in DIMACS:
 20063  20064 -20065  121 -20066 0
 20063  20064 -20065  121 -20067 0
 20063  20064 -20065  121 -20068 0

c  0-1 --> -1
c    (-b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧ -p_121) -> ( b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0)
c  in CNF:
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨  b^{121, 2}_2
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_1
c     b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨  b^{121, 2}_0
c  in DIMACS:
 20063  20064  20065  121  20066 0
 20063  20064  20065  121 -20067 0
 20063  20064  20065  121  20068 0

c  -1-1 --> -2
c    ( b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧  b^{121, 1}_0 ∧ -p_121) -> ( b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0)
c  in CNF:
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨  b^{121, 2}_2
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨  b^{121, 2}_1
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨  p_121 ∨ -b^{121, 2}_0
c  in DIMACS:
-20063  20064 -20065  121  20066 0
-20063  20064 -20065  121  20067 0
-20063  20064 -20065  121 -20068 0

c  -2-1 --> break 
c    ( b^{121, 1}_2 ∧  b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧ -p_121) -> break
c  in CNF:
c    -b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨  b^{121, 1}_0 ∨  p_121 ∨ break
c  in DIMACS:
-20063 -20064  20065  121 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 1}_2 ∧ -b^{121, 1}_1 ∧ -b^{121, 1}_0 ∧ true) 
c  in CNF:
c    -b^{121, 1}_2 ∨  b^{121, 1}_1 ∨  b^{121, 1}_0 ∨ false 
c  in DIMACS:
-20063  20064  20065  0

c  3 does not represent an automaton state.
c    -(-b^{121, 1}_2 ∧  b^{121, 1}_1 ∧  b^{121, 1}_0 ∧ true) 
c  in CNF:
c     b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ false 
c  in DIMACS:
 20063 -20064 -20065  0
c  -3 does not represent an automaton state.
c    -( b^{121, 1}_2 ∧  b^{121, 1}_1 ∧  b^{121, 1}_0 ∧ true) 
c  in CNF:
c    -b^{121, 1}_2 ∨ -b^{121, 1}_1 ∨ -b^{121, 1}_0 ∨ false 
c  in DIMACS:
-20063 -20064 -20065  0

c i = 2
c  -2+1 --> -1
c    ( b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧  p_242) -> ( b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0)
c  in CNF:
c    -b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨  b^{121, 3}_2
c    -b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_1
c    -b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨  b^{121, 3}_0
c  in DIMACS:
-20066 -20067  20068 -242  20069 0
-20066 -20067  20068 -242 -20070 0
-20066 -20067  20068 -242  20071 0

c  -1+1 --> 0
c    ( b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0 ∧  p_242) -> (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧ -b^{121, 3}_0)
c  in CNF:
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_2
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_1
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_0
c  in DIMACS:
-20066  20067 -20068 -242 -20069 0
-20066  20067 -20068 -242 -20070 0
-20066  20067 -20068 -242 -20071 0

c  0+1 --> 1
c    (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧  p_242) -> (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0)
c  in CNF:
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_2
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_1
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨  b^{121, 3}_0
c  in DIMACS:
 20066  20067  20068 -242 -20069 0
 20066  20067  20068 -242 -20070 0
 20066  20067  20068 -242  20071 0

c  1+1 --> 2
c    (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0 ∧  p_242) -> (-b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0)
c  in CNF:
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_2
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨  b^{121, 3}_1
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ -p_242 ∨ -b^{121, 3}_0
c  in DIMACS:
 20066  20067 -20068 -242 -20069 0
 20066  20067 -20068 -242  20070 0
 20066  20067 -20068 -242 -20071 0

c  2+1 --> break 
c    (-b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧  p_242) -> break
c  in CNF:
c     b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 20066 -20067  20068 -242 1162 0


c  2-1 --> 1
c    (-b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧ -p_242) -> (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0)
c  in CNF:
c     b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_2
c     b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_1
c     b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨  b^{121, 3}_0
c  in DIMACS:
 20066 -20067  20068  242 -20069 0
 20066 -20067  20068  242 -20070 0
 20066 -20067  20068  242  20071 0

c  1-1 --> 0
c    (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0 ∧ -p_242) -> (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧ -b^{121, 3}_0)
c  in CNF:
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_2
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_1
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_0
c  in DIMACS:
 20066  20067 -20068  242 -20069 0
 20066  20067 -20068  242 -20070 0
 20066  20067 -20068  242 -20071 0

c  0-1 --> -1
c    (-b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧ -p_242) -> ( b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0)
c  in CNF:
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨  b^{121, 3}_2
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_1
c     b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨  b^{121, 3}_0
c  in DIMACS:
 20066  20067  20068  242  20069 0
 20066  20067  20068  242 -20070 0
 20066  20067  20068  242  20071 0

c  -1-1 --> -2
c    ( b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧  b^{121, 2}_0 ∧ -p_242) -> ( b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0)
c  in CNF:
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨  b^{121, 3}_2
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨  b^{121, 3}_1
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨  p_242 ∨ -b^{121, 3}_0
c  in DIMACS:
-20066  20067 -20068  242  20069 0
-20066  20067 -20068  242  20070 0
-20066  20067 -20068  242 -20071 0

c  -2-1 --> break 
c    ( b^{121, 2}_2 ∧  b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨  b^{121, 2}_0 ∨  p_242 ∨ break
c  in DIMACS:
-20066 -20067  20068  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 2}_2 ∧ -b^{121, 2}_1 ∧ -b^{121, 2}_0 ∧ true) 
c  in CNF:
c    -b^{121, 2}_2 ∨  b^{121, 2}_1 ∨  b^{121, 2}_0 ∨ false 
c  in DIMACS:
-20066  20067  20068  0

c  3 does not represent an automaton state.
c    -(-b^{121, 2}_2 ∧  b^{121, 2}_1 ∧  b^{121, 2}_0 ∧ true) 
c  in CNF:
c     b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ false 
c  in DIMACS:
 20066 -20067 -20068  0
c  -3 does not represent an automaton state.
c    -( b^{121, 2}_2 ∧  b^{121, 2}_1 ∧  b^{121, 2}_0 ∧ true) 
c  in CNF:
c    -b^{121, 2}_2 ∨ -b^{121, 2}_1 ∨ -b^{121, 2}_0 ∨ false 
c  in DIMACS:
-20066 -20067 -20068  0

c i = 3
c  -2+1 --> -1
c    ( b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧  p_363) -> ( b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0)
c  in CNF:
c    -b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨  b^{121, 4}_2
c    -b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_1
c    -b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨  b^{121, 4}_0
c  in DIMACS:
-20069 -20070  20071 -363  20072 0
-20069 -20070  20071 -363 -20073 0
-20069 -20070  20071 -363  20074 0

c  -1+1 --> 0
c    ( b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0 ∧  p_363) -> (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧ -b^{121, 4}_0)
c  in CNF:
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_2
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_1
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_0
c  in DIMACS:
-20069  20070 -20071 -363 -20072 0
-20069  20070 -20071 -363 -20073 0
-20069  20070 -20071 -363 -20074 0

c  0+1 --> 1
c    (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧  p_363) -> (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0)
c  in CNF:
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_2
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_1
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨  b^{121, 4}_0
c  in DIMACS:
 20069  20070  20071 -363 -20072 0
 20069  20070  20071 -363 -20073 0
 20069  20070  20071 -363  20074 0

c  1+1 --> 2
c    (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0 ∧  p_363) -> (-b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0)
c  in CNF:
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_2
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨  b^{121, 4}_1
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ -p_363 ∨ -b^{121, 4}_0
c  in DIMACS:
 20069  20070 -20071 -363 -20072 0
 20069  20070 -20071 -363  20073 0
 20069  20070 -20071 -363 -20074 0

c  2+1 --> break 
c    (-b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧  p_363) -> break
c  in CNF:
c     b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 20069 -20070  20071 -363 1162 0


c  2-1 --> 1
c    (-b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧ -p_363) -> (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0)
c  in CNF:
c     b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_2
c     b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_1
c     b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨  b^{121, 4}_0
c  in DIMACS:
 20069 -20070  20071  363 -20072 0
 20069 -20070  20071  363 -20073 0
 20069 -20070  20071  363  20074 0

c  1-1 --> 0
c    (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0 ∧ -p_363) -> (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧ -b^{121, 4}_0)
c  in CNF:
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_2
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_1
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_0
c  in DIMACS:
 20069  20070 -20071  363 -20072 0
 20069  20070 -20071  363 -20073 0
 20069  20070 -20071  363 -20074 0

c  0-1 --> -1
c    (-b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧ -p_363) -> ( b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0)
c  in CNF:
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨  b^{121, 4}_2
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_1
c     b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨  b^{121, 4}_0
c  in DIMACS:
 20069  20070  20071  363  20072 0
 20069  20070  20071  363 -20073 0
 20069  20070  20071  363  20074 0

c  -1-1 --> -2
c    ( b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧  b^{121, 3}_0 ∧ -p_363) -> ( b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0)
c  in CNF:
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨  b^{121, 4}_2
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨  b^{121, 4}_1
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨  p_363 ∨ -b^{121, 4}_0
c  in DIMACS:
-20069  20070 -20071  363  20072 0
-20069  20070 -20071  363  20073 0
-20069  20070 -20071  363 -20074 0

c  -2-1 --> break 
c    ( b^{121, 3}_2 ∧  b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨  b^{121, 3}_0 ∨  p_363 ∨ break
c  in DIMACS:
-20069 -20070  20071  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 3}_2 ∧ -b^{121, 3}_1 ∧ -b^{121, 3}_0 ∧ true) 
c  in CNF:
c    -b^{121, 3}_2 ∨  b^{121, 3}_1 ∨  b^{121, 3}_0 ∨ false 
c  in DIMACS:
-20069  20070  20071  0

c  3 does not represent an automaton state.
c    -(-b^{121, 3}_2 ∧  b^{121, 3}_1 ∧  b^{121, 3}_0 ∧ true) 
c  in CNF:
c     b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ false 
c  in DIMACS:
 20069 -20070 -20071  0
c  -3 does not represent an automaton state.
c    -( b^{121, 3}_2 ∧  b^{121, 3}_1 ∧  b^{121, 3}_0 ∧ true) 
c  in CNF:
c    -b^{121, 3}_2 ∨ -b^{121, 3}_1 ∨ -b^{121, 3}_0 ∨ false 
c  in DIMACS:
-20069 -20070 -20071  0

c i = 4
c  -2+1 --> -1
c    ( b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧  p_484) -> ( b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0)
c  in CNF:
c    -b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨  b^{121, 5}_2
c    -b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_1
c    -b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨  b^{121, 5}_0
c  in DIMACS:
-20072 -20073  20074 -484  20075 0
-20072 -20073  20074 -484 -20076 0
-20072 -20073  20074 -484  20077 0

c  -1+1 --> 0
c    ( b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0 ∧  p_484) -> (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧ -b^{121, 5}_0)
c  in CNF:
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_2
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_1
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_0
c  in DIMACS:
-20072  20073 -20074 -484 -20075 0
-20072  20073 -20074 -484 -20076 0
-20072  20073 -20074 -484 -20077 0

c  0+1 --> 1
c    (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧  p_484) -> (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0)
c  in CNF:
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_2
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_1
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨  b^{121, 5}_0
c  in DIMACS:
 20072  20073  20074 -484 -20075 0
 20072  20073  20074 -484 -20076 0
 20072  20073  20074 -484  20077 0

c  1+1 --> 2
c    (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0 ∧  p_484) -> (-b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0)
c  in CNF:
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_2
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨  b^{121, 5}_1
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ -p_484 ∨ -b^{121, 5}_0
c  in DIMACS:
 20072  20073 -20074 -484 -20075 0
 20072  20073 -20074 -484  20076 0
 20072  20073 -20074 -484 -20077 0

c  2+1 --> break 
c    (-b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧  p_484) -> break
c  in CNF:
c     b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 20072 -20073  20074 -484 1162 0


c  2-1 --> 1
c    (-b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧ -p_484) -> (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0)
c  in CNF:
c     b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_2
c     b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_1
c     b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨  b^{121, 5}_0
c  in DIMACS:
 20072 -20073  20074  484 -20075 0
 20072 -20073  20074  484 -20076 0
 20072 -20073  20074  484  20077 0

c  1-1 --> 0
c    (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0 ∧ -p_484) -> (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧ -b^{121, 5}_0)
c  in CNF:
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_2
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_1
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_0
c  in DIMACS:
 20072  20073 -20074  484 -20075 0
 20072  20073 -20074  484 -20076 0
 20072  20073 -20074  484 -20077 0

c  0-1 --> -1
c    (-b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧ -p_484) -> ( b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0)
c  in CNF:
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨  b^{121, 5}_2
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_1
c     b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨  b^{121, 5}_0
c  in DIMACS:
 20072  20073  20074  484  20075 0
 20072  20073  20074  484 -20076 0
 20072  20073  20074  484  20077 0

c  -1-1 --> -2
c    ( b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧  b^{121, 4}_0 ∧ -p_484) -> ( b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0)
c  in CNF:
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨  b^{121, 5}_2
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨  b^{121, 5}_1
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨  p_484 ∨ -b^{121, 5}_0
c  in DIMACS:
-20072  20073 -20074  484  20075 0
-20072  20073 -20074  484  20076 0
-20072  20073 -20074  484 -20077 0

c  -2-1 --> break 
c    ( b^{121, 4}_2 ∧  b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨  b^{121, 4}_0 ∨  p_484 ∨ break
c  in DIMACS:
-20072 -20073  20074  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 4}_2 ∧ -b^{121, 4}_1 ∧ -b^{121, 4}_0 ∧ true) 
c  in CNF:
c    -b^{121, 4}_2 ∨  b^{121, 4}_1 ∨  b^{121, 4}_0 ∨ false 
c  in DIMACS:
-20072  20073  20074  0

c  3 does not represent an automaton state.
c    -(-b^{121, 4}_2 ∧  b^{121, 4}_1 ∧  b^{121, 4}_0 ∧ true) 
c  in CNF:
c     b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ false 
c  in DIMACS:
 20072 -20073 -20074  0
c  -3 does not represent an automaton state.
c    -( b^{121, 4}_2 ∧  b^{121, 4}_1 ∧  b^{121, 4}_0 ∧ true) 
c  in CNF:
c    -b^{121, 4}_2 ∨ -b^{121, 4}_1 ∨ -b^{121, 4}_0 ∨ false 
c  in DIMACS:
-20072 -20073 -20074  0

c i = 5
c  -2+1 --> -1
c    ( b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧  p_605) -> ( b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0)
c  in CNF:
c    -b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨  b^{121, 6}_2
c    -b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_1
c    -b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨  b^{121, 6}_0
c  in DIMACS:
-20075 -20076  20077 -605  20078 0
-20075 -20076  20077 -605 -20079 0
-20075 -20076  20077 -605  20080 0

c  -1+1 --> 0
c    ( b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0 ∧  p_605) -> (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧ -b^{121, 6}_0)
c  in CNF:
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_2
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_1
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_0
c  in DIMACS:
-20075  20076 -20077 -605 -20078 0
-20075  20076 -20077 -605 -20079 0
-20075  20076 -20077 -605 -20080 0

c  0+1 --> 1
c    (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧  p_605) -> (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0)
c  in CNF:
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_2
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_1
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨  b^{121, 6}_0
c  in DIMACS:
 20075  20076  20077 -605 -20078 0
 20075  20076  20077 -605 -20079 0
 20075  20076  20077 -605  20080 0

c  1+1 --> 2
c    (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0 ∧  p_605) -> (-b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0)
c  in CNF:
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_2
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨  b^{121, 6}_1
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ -p_605 ∨ -b^{121, 6}_0
c  in DIMACS:
 20075  20076 -20077 -605 -20078 0
 20075  20076 -20077 -605  20079 0
 20075  20076 -20077 -605 -20080 0

c  2+1 --> break 
c    (-b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧  p_605) -> break
c  in CNF:
c     b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ -p_605 ∨ break
c  in DIMACS:
 20075 -20076  20077 -605 1162 0


c  2-1 --> 1
c    (-b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧ -p_605) -> (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0)
c  in CNF:
c     b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_2
c     b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_1
c     b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨  b^{121, 6}_0
c  in DIMACS:
 20075 -20076  20077  605 -20078 0
 20075 -20076  20077  605 -20079 0
 20075 -20076  20077  605  20080 0

c  1-1 --> 0
c    (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0 ∧ -p_605) -> (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧ -b^{121, 6}_0)
c  in CNF:
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_2
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_1
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_0
c  in DIMACS:
 20075  20076 -20077  605 -20078 0
 20075  20076 -20077  605 -20079 0
 20075  20076 -20077  605 -20080 0

c  0-1 --> -1
c    (-b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧ -p_605) -> ( b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0)
c  in CNF:
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨  b^{121, 6}_2
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_1
c     b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨  b^{121, 6}_0
c  in DIMACS:
 20075  20076  20077  605  20078 0
 20075  20076  20077  605 -20079 0
 20075  20076  20077  605  20080 0

c  -1-1 --> -2
c    ( b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧  b^{121, 5}_0 ∧ -p_605) -> ( b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0)
c  in CNF:
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨  b^{121, 6}_2
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨  b^{121, 6}_1
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨  p_605 ∨ -b^{121, 6}_0
c  in DIMACS:
-20075  20076 -20077  605  20078 0
-20075  20076 -20077  605  20079 0
-20075  20076 -20077  605 -20080 0

c  -2-1 --> break 
c    ( b^{121, 5}_2 ∧  b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧ -p_605) -> break
c  in CNF:
c    -b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨  b^{121, 5}_0 ∨  p_605 ∨ break
c  in DIMACS:
-20075 -20076  20077  605 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 5}_2 ∧ -b^{121, 5}_1 ∧ -b^{121, 5}_0 ∧ true) 
c  in CNF:
c    -b^{121, 5}_2 ∨  b^{121, 5}_1 ∨  b^{121, 5}_0 ∨ false 
c  in DIMACS:
-20075  20076  20077  0

c  3 does not represent an automaton state.
c    -(-b^{121, 5}_2 ∧  b^{121, 5}_1 ∧  b^{121, 5}_0 ∧ true) 
c  in CNF:
c     b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ false 
c  in DIMACS:
 20075 -20076 -20077  0
c  -3 does not represent an automaton state.
c    -( b^{121, 5}_2 ∧  b^{121, 5}_1 ∧  b^{121, 5}_0 ∧ true) 
c  in CNF:
c    -b^{121, 5}_2 ∨ -b^{121, 5}_1 ∨ -b^{121, 5}_0 ∨ false 
c  in DIMACS:
-20075 -20076 -20077  0

c i = 6
c  -2+1 --> -1
c    ( b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧  p_726) -> ( b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0)
c  in CNF:
c    -b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨  b^{121, 7}_2
c    -b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_1
c    -b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨  b^{121, 7}_0
c  in DIMACS:
-20078 -20079  20080 -726  20081 0
-20078 -20079  20080 -726 -20082 0
-20078 -20079  20080 -726  20083 0

c  -1+1 --> 0
c    ( b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0 ∧  p_726) -> (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧ -b^{121, 7}_0)
c  in CNF:
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_2
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_1
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_0
c  in DIMACS:
-20078  20079 -20080 -726 -20081 0
-20078  20079 -20080 -726 -20082 0
-20078  20079 -20080 -726 -20083 0

c  0+1 --> 1
c    (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧  p_726) -> (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0)
c  in CNF:
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_2
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_1
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨  b^{121, 7}_0
c  in DIMACS:
 20078  20079  20080 -726 -20081 0
 20078  20079  20080 -726 -20082 0
 20078  20079  20080 -726  20083 0

c  1+1 --> 2
c    (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0 ∧  p_726) -> (-b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0)
c  in CNF:
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_2
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨  b^{121, 7}_1
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ -p_726 ∨ -b^{121, 7}_0
c  in DIMACS:
 20078  20079 -20080 -726 -20081 0
 20078  20079 -20080 -726  20082 0
 20078  20079 -20080 -726 -20083 0

c  2+1 --> break 
c    (-b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧  p_726) -> break
c  in CNF:
c     b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 20078 -20079  20080 -726 1162 0


c  2-1 --> 1
c    (-b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧ -p_726) -> (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0)
c  in CNF:
c     b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_2
c     b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_1
c     b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨  b^{121, 7}_0
c  in DIMACS:
 20078 -20079  20080  726 -20081 0
 20078 -20079  20080  726 -20082 0
 20078 -20079  20080  726  20083 0

c  1-1 --> 0
c    (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0 ∧ -p_726) -> (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧ -b^{121, 7}_0)
c  in CNF:
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_2
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_1
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_0
c  in DIMACS:
 20078  20079 -20080  726 -20081 0
 20078  20079 -20080  726 -20082 0
 20078  20079 -20080  726 -20083 0

c  0-1 --> -1
c    (-b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧ -p_726) -> ( b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0)
c  in CNF:
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨  b^{121, 7}_2
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_1
c     b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨  b^{121, 7}_0
c  in DIMACS:
 20078  20079  20080  726  20081 0
 20078  20079  20080  726 -20082 0
 20078  20079  20080  726  20083 0

c  -1-1 --> -2
c    ( b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧  b^{121, 6}_0 ∧ -p_726) -> ( b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0)
c  in CNF:
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨  b^{121, 7}_2
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨  b^{121, 7}_1
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨  p_726 ∨ -b^{121, 7}_0
c  in DIMACS:
-20078  20079 -20080  726  20081 0
-20078  20079 -20080  726  20082 0
-20078  20079 -20080  726 -20083 0

c  -2-1 --> break 
c    ( b^{121, 6}_2 ∧  b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨  b^{121, 6}_0 ∨  p_726 ∨ break
c  in DIMACS:
-20078 -20079  20080  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 6}_2 ∧ -b^{121, 6}_1 ∧ -b^{121, 6}_0 ∧ true) 
c  in CNF:
c    -b^{121, 6}_2 ∨  b^{121, 6}_1 ∨  b^{121, 6}_0 ∨ false 
c  in DIMACS:
-20078  20079  20080  0

c  3 does not represent an automaton state.
c    -(-b^{121, 6}_2 ∧  b^{121, 6}_1 ∧  b^{121, 6}_0 ∧ true) 
c  in CNF:
c     b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ false 
c  in DIMACS:
 20078 -20079 -20080  0
c  -3 does not represent an automaton state.
c    -( b^{121, 6}_2 ∧  b^{121, 6}_1 ∧  b^{121, 6}_0 ∧ true) 
c  in CNF:
c    -b^{121, 6}_2 ∨ -b^{121, 6}_1 ∨ -b^{121, 6}_0 ∨ false 
c  in DIMACS:
-20078 -20079 -20080  0

c i = 7
c  -2+1 --> -1
c    ( b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧  p_847) -> ( b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0)
c  in CNF:
c    -b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨  b^{121, 8}_2
c    -b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_1
c    -b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨  b^{121, 8}_0
c  in DIMACS:
-20081 -20082  20083 -847  20084 0
-20081 -20082  20083 -847 -20085 0
-20081 -20082  20083 -847  20086 0

c  -1+1 --> 0
c    ( b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0 ∧  p_847) -> (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧ -b^{121, 8}_0)
c  in CNF:
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_2
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_1
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_0
c  in DIMACS:
-20081  20082 -20083 -847 -20084 0
-20081  20082 -20083 -847 -20085 0
-20081  20082 -20083 -847 -20086 0

c  0+1 --> 1
c    (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧  p_847) -> (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0)
c  in CNF:
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_2
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_1
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨  b^{121, 8}_0
c  in DIMACS:
 20081  20082  20083 -847 -20084 0
 20081  20082  20083 -847 -20085 0
 20081  20082  20083 -847  20086 0

c  1+1 --> 2
c    (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0 ∧  p_847) -> (-b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0)
c  in CNF:
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_2
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨  b^{121, 8}_1
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ -p_847 ∨ -b^{121, 8}_0
c  in DIMACS:
 20081  20082 -20083 -847 -20084 0
 20081  20082 -20083 -847  20085 0
 20081  20082 -20083 -847 -20086 0

c  2+1 --> break 
c    (-b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧  p_847) -> break
c  in CNF:
c     b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ -p_847 ∨ break
c  in DIMACS:
 20081 -20082  20083 -847 1162 0


c  2-1 --> 1
c    (-b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧ -p_847) -> (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0)
c  in CNF:
c     b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_2
c     b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_1
c     b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨  b^{121, 8}_0
c  in DIMACS:
 20081 -20082  20083  847 -20084 0
 20081 -20082  20083  847 -20085 0
 20081 -20082  20083  847  20086 0

c  1-1 --> 0
c    (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0 ∧ -p_847) -> (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧ -b^{121, 8}_0)
c  in CNF:
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_2
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_1
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_0
c  in DIMACS:
 20081  20082 -20083  847 -20084 0
 20081  20082 -20083  847 -20085 0
 20081  20082 -20083  847 -20086 0

c  0-1 --> -1
c    (-b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧ -p_847) -> ( b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0)
c  in CNF:
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨  b^{121, 8}_2
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_1
c     b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨  b^{121, 8}_0
c  in DIMACS:
 20081  20082  20083  847  20084 0
 20081  20082  20083  847 -20085 0
 20081  20082  20083  847  20086 0

c  -1-1 --> -2
c    ( b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧  b^{121, 7}_0 ∧ -p_847) -> ( b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0)
c  in CNF:
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨  b^{121, 8}_2
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨  b^{121, 8}_1
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨  p_847 ∨ -b^{121, 8}_0
c  in DIMACS:
-20081  20082 -20083  847  20084 0
-20081  20082 -20083  847  20085 0
-20081  20082 -20083  847 -20086 0

c  -2-1 --> break 
c    ( b^{121, 7}_2 ∧  b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧ -p_847) -> break
c  in CNF:
c    -b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨  b^{121, 7}_0 ∨  p_847 ∨ break
c  in DIMACS:
-20081 -20082  20083  847 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 7}_2 ∧ -b^{121, 7}_1 ∧ -b^{121, 7}_0 ∧ true) 
c  in CNF:
c    -b^{121, 7}_2 ∨  b^{121, 7}_1 ∨  b^{121, 7}_0 ∨ false 
c  in DIMACS:
-20081  20082  20083  0

c  3 does not represent an automaton state.
c    -(-b^{121, 7}_2 ∧  b^{121, 7}_1 ∧  b^{121, 7}_0 ∧ true) 
c  in CNF:
c     b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ false 
c  in DIMACS:
 20081 -20082 -20083  0
c  -3 does not represent an automaton state.
c    -( b^{121, 7}_2 ∧  b^{121, 7}_1 ∧  b^{121, 7}_0 ∧ true) 
c  in CNF:
c    -b^{121, 7}_2 ∨ -b^{121, 7}_1 ∨ -b^{121, 7}_0 ∨ false 
c  in DIMACS:
-20081 -20082 -20083  0

c i = 8
c  -2+1 --> -1
c    ( b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧  p_968) -> ( b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0)
c  in CNF:
c    -b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨  b^{121, 9}_2
c    -b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_1
c    -b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨  b^{121, 9}_0
c  in DIMACS:
-20084 -20085  20086 -968  20087 0
-20084 -20085  20086 -968 -20088 0
-20084 -20085  20086 -968  20089 0

c  -1+1 --> 0
c    ( b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0 ∧  p_968) -> (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧ -b^{121, 9}_0)
c  in CNF:
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_2
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_1
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_0
c  in DIMACS:
-20084  20085 -20086 -968 -20087 0
-20084  20085 -20086 -968 -20088 0
-20084  20085 -20086 -968 -20089 0

c  0+1 --> 1
c    (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧  p_968) -> (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0)
c  in CNF:
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_2
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_1
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨  b^{121, 9}_0
c  in DIMACS:
 20084  20085  20086 -968 -20087 0
 20084  20085  20086 -968 -20088 0
 20084  20085  20086 -968  20089 0

c  1+1 --> 2
c    (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0 ∧  p_968) -> (-b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0)
c  in CNF:
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_2
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨  b^{121, 9}_1
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ -p_968 ∨ -b^{121, 9}_0
c  in DIMACS:
 20084  20085 -20086 -968 -20087 0
 20084  20085 -20086 -968  20088 0
 20084  20085 -20086 -968 -20089 0

c  2+1 --> break 
c    (-b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧  p_968) -> break
c  in CNF:
c     b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 20084 -20085  20086 -968 1162 0


c  2-1 --> 1
c    (-b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧ -p_968) -> (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0)
c  in CNF:
c     b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_2
c     b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_1
c     b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨  b^{121, 9}_0
c  in DIMACS:
 20084 -20085  20086  968 -20087 0
 20084 -20085  20086  968 -20088 0
 20084 -20085  20086  968  20089 0

c  1-1 --> 0
c    (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0 ∧ -p_968) -> (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧ -b^{121, 9}_0)
c  in CNF:
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_2
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_1
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_0
c  in DIMACS:
 20084  20085 -20086  968 -20087 0
 20084  20085 -20086  968 -20088 0
 20084  20085 -20086  968 -20089 0

c  0-1 --> -1
c    (-b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧ -p_968) -> ( b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0)
c  in CNF:
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨  b^{121, 9}_2
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_1
c     b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨  b^{121, 9}_0
c  in DIMACS:
 20084  20085  20086  968  20087 0
 20084  20085  20086  968 -20088 0
 20084  20085  20086  968  20089 0

c  -1-1 --> -2
c    ( b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧  b^{121, 8}_0 ∧ -p_968) -> ( b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0)
c  in CNF:
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨  b^{121, 9}_2
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨  b^{121, 9}_1
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨  p_968 ∨ -b^{121, 9}_0
c  in DIMACS:
-20084  20085 -20086  968  20087 0
-20084  20085 -20086  968  20088 0
-20084  20085 -20086  968 -20089 0

c  -2-1 --> break 
c    ( b^{121, 8}_2 ∧  b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨  b^{121, 8}_0 ∨  p_968 ∨ break
c  in DIMACS:
-20084 -20085  20086  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 8}_2 ∧ -b^{121, 8}_1 ∧ -b^{121, 8}_0 ∧ true) 
c  in CNF:
c    -b^{121, 8}_2 ∨  b^{121, 8}_1 ∨  b^{121, 8}_0 ∨ false 
c  in DIMACS:
-20084  20085  20086  0

c  3 does not represent an automaton state.
c    -(-b^{121, 8}_2 ∧  b^{121, 8}_1 ∧  b^{121, 8}_0 ∧ true) 
c  in CNF:
c     b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ false 
c  in DIMACS:
 20084 -20085 -20086  0
c  -3 does not represent an automaton state.
c    -( b^{121, 8}_2 ∧  b^{121, 8}_1 ∧  b^{121, 8}_0 ∧ true) 
c  in CNF:
c    -b^{121, 8}_2 ∨ -b^{121, 8}_1 ∨ -b^{121, 8}_0 ∨ false 
c  in DIMACS:
-20084 -20085 -20086  0

c i = 9
c  -2+1 --> -1
c    ( b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧  p_1089) -> ( b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧  b^{121, 10}_0)
c  in CNF:
c    -b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨  b^{121, 10}_2
c    -b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_1
c    -b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨  b^{121, 10}_0
c  in DIMACS:
-20087 -20088  20089 -1089  20090 0
-20087 -20088  20089 -1089 -20091 0
-20087 -20088  20089 -1089  20092 0

c  -1+1 --> 0
c    ( b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0 ∧  p_1089) -> (-b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧ -b^{121, 10}_0)
c  in CNF:
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_2
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_1
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_0
c  in DIMACS:
-20087  20088 -20089 -1089 -20090 0
-20087  20088 -20089 -1089 -20091 0
-20087  20088 -20089 -1089 -20092 0

c  0+1 --> 1
c    (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧  p_1089) -> (-b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧  b^{121, 10}_0)
c  in CNF:
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_2
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_1
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨  b^{121, 10}_0
c  in DIMACS:
 20087  20088  20089 -1089 -20090 0
 20087  20088  20089 -1089 -20091 0
 20087  20088  20089 -1089  20092 0

c  1+1 --> 2
c    (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0 ∧  p_1089) -> (-b^{121, 10}_2 ∧  b^{121, 10}_1 ∧ -b^{121, 10}_0)
c  in CNF:
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_2
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨  b^{121, 10}_1
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ -p_1089 ∨ -b^{121, 10}_0
c  in DIMACS:
 20087  20088 -20089 -1089 -20090 0
 20087  20088 -20089 -1089  20091 0
 20087  20088 -20089 -1089 -20092 0

c  2+1 --> break 
c    (-b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 20087 -20088  20089 -1089 1162 0


c  2-1 --> 1
c    (-b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧ -p_1089) -> (-b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧  b^{121, 10}_0)
c  in CNF:
c     b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_2
c     b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_1
c     b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨  b^{121, 10}_0
c  in DIMACS:
 20087 -20088  20089  1089 -20090 0
 20087 -20088  20089  1089 -20091 0
 20087 -20088  20089  1089  20092 0

c  1-1 --> 0
c    (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0 ∧ -p_1089) -> (-b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧ -b^{121, 10}_0)
c  in CNF:
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_2
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_1
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_0
c  in DIMACS:
 20087  20088 -20089  1089 -20090 0
 20087  20088 -20089  1089 -20091 0
 20087  20088 -20089  1089 -20092 0

c  0-1 --> -1
c    (-b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧ -p_1089) -> ( b^{121, 10}_2 ∧ -b^{121, 10}_1 ∧  b^{121, 10}_0)
c  in CNF:
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨  b^{121, 10}_2
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_1
c     b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨  b^{121, 10}_0
c  in DIMACS:
 20087  20088  20089  1089  20090 0
 20087  20088  20089  1089 -20091 0
 20087  20088  20089  1089  20092 0

c  -1-1 --> -2
c    ( b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧  b^{121, 9}_0 ∧ -p_1089) -> ( b^{121, 10}_2 ∧  b^{121, 10}_1 ∧ -b^{121, 10}_0)
c  in CNF:
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨  b^{121, 10}_2
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨  b^{121, 10}_1
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨  p_1089 ∨ -b^{121, 10}_0
c  in DIMACS:
-20087  20088 -20089  1089  20090 0
-20087  20088 -20089  1089  20091 0
-20087  20088 -20089  1089 -20092 0

c  -2-1 --> break 
c    ( b^{121, 9}_2 ∧  b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨  b^{121, 9}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-20087 -20088  20089  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{121, 9}_2 ∧ -b^{121, 9}_1 ∧ -b^{121, 9}_0 ∧ true) 
c  in CNF:
c    -b^{121, 9}_2 ∨  b^{121, 9}_1 ∨  b^{121, 9}_0 ∨ false 
c  in DIMACS:
-20087  20088  20089  0

c  3 does not represent an automaton state.
c    -(-b^{121, 9}_2 ∧  b^{121, 9}_1 ∧  b^{121, 9}_0 ∧ true) 
c  in CNF:
c     b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ false 
c  in DIMACS:
 20087 -20088 -20089  0
c  -3 does not represent an automaton state.
c    -( b^{121, 9}_2 ∧  b^{121, 9}_1 ∧  b^{121, 9}_0 ∧ true) 
c  in CNF:
c    -b^{121, 9}_2 ∨ -b^{121, 9}_1 ∨ -b^{121, 9}_0 ∨ false 
c  in DIMACS:
-20087 -20088 -20089  0

c INIT for k = 122
c    -b^{122, 1}_2
c    -b^{122, 1}_1
c    -b^{122, 1}_0
c  in DIMACS:
-20093 0
-20094 0
-20095 0

c Transitions for k = 122
c i = 1
c  -2+1 --> -1
c    ( b^{122, 1}_2 ∧  b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧  p_122) -> ( b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0)
c  in CNF:
c    -b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨  b^{122, 2}_2
c    -b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_1
c    -b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨  b^{122, 2}_0
c  in DIMACS:
-20093 -20094  20095 -122  20096 0
-20093 -20094  20095 -122 -20097 0
-20093 -20094  20095 -122  20098 0

c  -1+1 --> 0
c    ( b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧  b^{122, 1}_0 ∧  p_122) -> (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧ -b^{122, 2}_0)
c  in CNF:
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_2
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_1
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_0
c  in DIMACS:
-20093  20094 -20095 -122 -20096 0
-20093  20094 -20095 -122 -20097 0
-20093  20094 -20095 -122 -20098 0

c  0+1 --> 1
c    (-b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧  p_122) -> (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0)
c  in CNF:
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_2
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_1
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨  b^{122, 2}_0
c  in DIMACS:
 20093  20094  20095 -122 -20096 0
 20093  20094  20095 -122 -20097 0
 20093  20094  20095 -122  20098 0

c  1+1 --> 2
c    (-b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧  b^{122, 1}_0 ∧  p_122) -> (-b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0)
c  in CNF:
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_2
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨  b^{122, 2}_1
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ -p_122 ∨ -b^{122, 2}_0
c  in DIMACS:
 20093  20094 -20095 -122 -20096 0
 20093  20094 -20095 -122  20097 0
 20093  20094 -20095 -122 -20098 0

c  2+1 --> break 
c    (-b^{122, 1}_2 ∧  b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧  p_122) -> break
c  in CNF:
c     b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ -p_122 ∨ break
c  in DIMACS:
 20093 -20094  20095 -122 1162 0


c  2-1 --> 1
c    (-b^{122, 1}_2 ∧  b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧ -p_122) -> (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0)
c  in CNF:
c     b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_2
c     b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_1
c     b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨  b^{122, 2}_0
c  in DIMACS:
 20093 -20094  20095  122 -20096 0
 20093 -20094  20095  122 -20097 0
 20093 -20094  20095  122  20098 0

c  1-1 --> 0
c    (-b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧  b^{122, 1}_0 ∧ -p_122) -> (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧ -b^{122, 2}_0)
c  in CNF:
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_2
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_1
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_0
c  in DIMACS:
 20093  20094 -20095  122 -20096 0
 20093  20094 -20095  122 -20097 0
 20093  20094 -20095  122 -20098 0

c  0-1 --> -1
c    (-b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧ -p_122) -> ( b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0)
c  in CNF:
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨  b^{122, 2}_2
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_1
c     b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨  b^{122, 2}_0
c  in DIMACS:
 20093  20094  20095  122  20096 0
 20093  20094  20095  122 -20097 0
 20093  20094  20095  122  20098 0

c  -1-1 --> -2
c    ( b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧  b^{122, 1}_0 ∧ -p_122) -> ( b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0)
c  in CNF:
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨  b^{122, 2}_2
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨  b^{122, 2}_1
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨  p_122 ∨ -b^{122, 2}_0
c  in DIMACS:
-20093  20094 -20095  122  20096 0
-20093  20094 -20095  122  20097 0
-20093  20094 -20095  122 -20098 0

c  -2-1 --> break 
c    ( b^{122, 1}_2 ∧  b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧ -p_122) -> break
c  in CNF:
c    -b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨  b^{122, 1}_0 ∨  p_122 ∨ break
c  in DIMACS:
-20093 -20094  20095  122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 1}_2 ∧ -b^{122, 1}_1 ∧ -b^{122, 1}_0 ∧ true) 
c  in CNF:
c    -b^{122, 1}_2 ∨  b^{122, 1}_1 ∨  b^{122, 1}_0 ∨ false 
c  in DIMACS:
-20093  20094  20095  0

c  3 does not represent an automaton state.
c    -(-b^{122, 1}_2 ∧  b^{122, 1}_1 ∧  b^{122, 1}_0 ∧ true) 
c  in CNF:
c     b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ false 
c  in DIMACS:
 20093 -20094 -20095  0
c  -3 does not represent an automaton state.
c    -( b^{122, 1}_2 ∧  b^{122, 1}_1 ∧  b^{122, 1}_0 ∧ true) 
c  in CNF:
c    -b^{122, 1}_2 ∨ -b^{122, 1}_1 ∨ -b^{122, 1}_0 ∨ false 
c  in DIMACS:
-20093 -20094 -20095  0

c i = 2
c  -2+1 --> -1
c    ( b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧  p_244) -> ( b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0)
c  in CNF:
c    -b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨  b^{122, 3}_2
c    -b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_1
c    -b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨  b^{122, 3}_0
c  in DIMACS:
-20096 -20097  20098 -244  20099 0
-20096 -20097  20098 -244 -20100 0
-20096 -20097  20098 -244  20101 0

c  -1+1 --> 0
c    ( b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0 ∧  p_244) -> (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧ -b^{122, 3}_0)
c  in CNF:
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_2
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_1
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_0
c  in DIMACS:
-20096  20097 -20098 -244 -20099 0
-20096  20097 -20098 -244 -20100 0
-20096  20097 -20098 -244 -20101 0

c  0+1 --> 1
c    (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧  p_244) -> (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0)
c  in CNF:
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_2
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_1
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨  b^{122, 3}_0
c  in DIMACS:
 20096  20097  20098 -244 -20099 0
 20096  20097  20098 -244 -20100 0
 20096  20097  20098 -244  20101 0

c  1+1 --> 2
c    (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0 ∧  p_244) -> (-b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0)
c  in CNF:
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_2
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨  b^{122, 3}_1
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ -p_244 ∨ -b^{122, 3}_0
c  in DIMACS:
 20096  20097 -20098 -244 -20099 0
 20096  20097 -20098 -244  20100 0
 20096  20097 -20098 -244 -20101 0

c  2+1 --> break 
c    (-b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧  p_244) -> break
c  in CNF:
c     b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 20096 -20097  20098 -244 1162 0


c  2-1 --> 1
c    (-b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧ -p_244) -> (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0)
c  in CNF:
c     b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_2
c     b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_1
c     b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨  b^{122, 3}_0
c  in DIMACS:
 20096 -20097  20098  244 -20099 0
 20096 -20097  20098  244 -20100 0
 20096 -20097  20098  244  20101 0

c  1-1 --> 0
c    (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0 ∧ -p_244) -> (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧ -b^{122, 3}_0)
c  in CNF:
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_2
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_1
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_0
c  in DIMACS:
 20096  20097 -20098  244 -20099 0
 20096  20097 -20098  244 -20100 0
 20096  20097 -20098  244 -20101 0

c  0-1 --> -1
c    (-b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧ -p_244) -> ( b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0)
c  in CNF:
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨  b^{122, 3}_2
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_1
c     b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨  b^{122, 3}_0
c  in DIMACS:
 20096  20097  20098  244  20099 0
 20096  20097  20098  244 -20100 0
 20096  20097  20098  244  20101 0

c  -1-1 --> -2
c    ( b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧  b^{122, 2}_0 ∧ -p_244) -> ( b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0)
c  in CNF:
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨  b^{122, 3}_2
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨  b^{122, 3}_1
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨  p_244 ∨ -b^{122, 3}_0
c  in DIMACS:
-20096  20097 -20098  244  20099 0
-20096  20097 -20098  244  20100 0
-20096  20097 -20098  244 -20101 0

c  -2-1 --> break 
c    ( b^{122, 2}_2 ∧  b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨  b^{122, 2}_0 ∨  p_244 ∨ break
c  in DIMACS:
-20096 -20097  20098  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 2}_2 ∧ -b^{122, 2}_1 ∧ -b^{122, 2}_0 ∧ true) 
c  in CNF:
c    -b^{122, 2}_2 ∨  b^{122, 2}_1 ∨  b^{122, 2}_0 ∨ false 
c  in DIMACS:
-20096  20097  20098  0

c  3 does not represent an automaton state.
c    -(-b^{122, 2}_2 ∧  b^{122, 2}_1 ∧  b^{122, 2}_0 ∧ true) 
c  in CNF:
c     b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ false 
c  in DIMACS:
 20096 -20097 -20098  0
c  -3 does not represent an automaton state.
c    -( b^{122, 2}_2 ∧  b^{122, 2}_1 ∧  b^{122, 2}_0 ∧ true) 
c  in CNF:
c    -b^{122, 2}_2 ∨ -b^{122, 2}_1 ∨ -b^{122, 2}_0 ∨ false 
c  in DIMACS:
-20096 -20097 -20098  0

c i = 3
c  -2+1 --> -1
c    ( b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧  p_366) -> ( b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0)
c  in CNF:
c    -b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨  b^{122, 4}_2
c    -b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_1
c    -b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨  b^{122, 4}_0
c  in DIMACS:
-20099 -20100  20101 -366  20102 0
-20099 -20100  20101 -366 -20103 0
-20099 -20100  20101 -366  20104 0

c  -1+1 --> 0
c    ( b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0 ∧  p_366) -> (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧ -b^{122, 4}_0)
c  in CNF:
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_2
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_1
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_0
c  in DIMACS:
-20099  20100 -20101 -366 -20102 0
-20099  20100 -20101 -366 -20103 0
-20099  20100 -20101 -366 -20104 0

c  0+1 --> 1
c    (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧  p_366) -> (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0)
c  in CNF:
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_2
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_1
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨  b^{122, 4}_0
c  in DIMACS:
 20099  20100  20101 -366 -20102 0
 20099  20100  20101 -366 -20103 0
 20099  20100  20101 -366  20104 0

c  1+1 --> 2
c    (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0 ∧  p_366) -> (-b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0)
c  in CNF:
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_2
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨  b^{122, 4}_1
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ -p_366 ∨ -b^{122, 4}_0
c  in DIMACS:
 20099  20100 -20101 -366 -20102 0
 20099  20100 -20101 -366  20103 0
 20099  20100 -20101 -366 -20104 0

c  2+1 --> break 
c    (-b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧  p_366) -> break
c  in CNF:
c     b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 20099 -20100  20101 -366 1162 0


c  2-1 --> 1
c    (-b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧ -p_366) -> (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0)
c  in CNF:
c     b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_2
c     b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_1
c     b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨  b^{122, 4}_0
c  in DIMACS:
 20099 -20100  20101  366 -20102 0
 20099 -20100  20101  366 -20103 0
 20099 -20100  20101  366  20104 0

c  1-1 --> 0
c    (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0 ∧ -p_366) -> (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧ -b^{122, 4}_0)
c  in CNF:
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_2
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_1
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_0
c  in DIMACS:
 20099  20100 -20101  366 -20102 0
 20099  20100 -20101  366 -20103 0
 20099  20100 -20101  366 -20104 0

c  0-1 --> -1
c    (-b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧ -p_366) -> ( b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0)
c  in CNF:
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨  b^{122, 4}_2
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_1
c     b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨  b^{122, 4}_0
c  in DIMACS:
 20099  20100  20101  366  20102 0
 20099  20100  20101  366 -20103 0
 20099  20100  20101  366  20104 0

c  -1-1 --> -2
c    ( b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧  b^{122, 3}_0 ∧ -p_366) -> ( b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0)
c  in CNF:
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨  b^{122, 4}_2
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨  b^{122, 4}_1
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨  p_366 ∨ -b^{122, 4}_0
c  in DIMACS:
-20099  20100 -20101  366  20102 0
-20099  20100 -20101  366  20103 0
-20099  20100 -20101  366 -20104 0

c  -2-1 --> break 
c    ( b^{122, 3}_2 ∧  b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨  b^{122, 3}_0 ∨  p_366 ∨ break
c  in DIMACS:
-20099 -20100  20101  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 3}_2 ∧ -b^{122, 3}_1 ∧ -b^{122, 3}_0 ∧ true) 
c  in CNF:
c    -b^{122, 3}_2 ∨  b^{122, 3}_1 ∨  b^{122, 3}_0 ∨ false 
c  in DIMACS:
-20099  20100  20101  0

c  3 does not represent an automaton state.
c    -(-b^{122, 3}_2 ∧  b^{122, 3}_1 ∧  b^{122, 3}_0 ∧ true) 
c  in CNF:
c     b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ false 
c  in DIMACS:
 20099 -20100 -20101  0
c  -3 does not represent an automaton state.
c    -( b^{122, 3}_2 ∧  b^{122, 3}_1 ∧  b^{122, 3}_0 ∧ true) 
c  in CNF:
c    -b^{122, 3}_2 ∨ -b^{122, 3}_1 ∨ -b^{122, 3}_0 ∨ false 
c  in DIMACS:
-20099 -20100 -20101  0

c i = 4
c  -2+1 --> -1
c    ( b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧  p_488) -> ( b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0)
c  in CNF:
c    -b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨  b^{122, 5}_2
c    -b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_1
c    -b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨  b^{122, 5}_0
c  in DIMACS:
-20102 -20103  20104 -488  20105 0
-20102 -20103  20104 -488 -20106 0
-20102 -20103  20104 -488  20107 0

c  -1+1 --> 0
c    ( b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0 ∧  p_488) -> (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧ -b^{122, 5}_0)
c  in CNF:
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_2
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_1
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_0
c  in DIMACS:
-20102  20103 -20104 -488 -20105 0
-20102  20103 -20104 -488 -20106 0
-20102  20103 -20104 -488 -20107 0

c  0+1 --> 1
c    (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧  p_488) -> (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0)
c  in CNF:
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_2
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_1
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨  b^{122, 5}_0
c  in DIMACS:
 20102  20103  20104 -488 -20105 0
 20102  20103  20104 -488 -20106 0
 20102  20103  20104 -488  20107 0

c  1+1 --> 2
c    (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0 ∧  p_488) -> (-b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0)
c  in CNF:
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_2
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨  b^{122, 5}_1
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ -p_488 ∨ -b^{122, 5}_0
c  in DIMACS:
 20102  20103 -20104 -488 -20105 0
 20102  20103 -20104 -488  20106 0
 20102  20103 -20104 -488 -20107 0

c  2+1 --> break 
c    (-b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧  p_488) -> break
c  in CNF:
c     b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 20102 -20103  20104 -488 1162 0


c  2-1 --> 1
c    (-b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧ -p_488) -> (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0)
c  in CNF:
c     b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_2
c     b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_1
c     b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨  b^{122, 5}_0
c  in DIMACS:
 20102 -20103  20104  488 -20105 0
 20102 -20103  20104  488 -20106 0
 20102 -20103  20104  488  20107 0

c  1-1 --> 0
c    (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0 ∧ -p_488) -> (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧ -b^{122, 5}_0)
c  in CNF:
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_2
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_1
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_0
c  in DIMACS:
 20102  20103 -20104  488 -20105 0
 20102  20103 -20104  488 -20106 0
 20102  20103 -20104  488 -20107 0

c  0-1 --> -1
c    (-b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧ -p_488) -> ( b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0)
c  in CNF:
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨  b^{122, 5}_2
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_1
c     b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨  b^{122, 5}_0
c  in DIMACS:
 20102  20103  20104  488  20105 0
 20102  20103  20104  488 -20106 0
 20102  20103  20104  488  20107 0

c  -1-1 --> -2
c    ( b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧  b^{122, 4}_0 ∧ -p_488) -> ( b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0)
c  in CNF:
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨  b^{122, 5}_2
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨  b^{122, 5}_1
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨  p_488 ∨ -b^{122, 5}_0
c  in DIMACS:
-20102  20103 -20104  488  20105 0
-20102  20103 -20104  488  20106 0
-20102  20103 -20104  488 -20107 0

c  -2-1 --> break 
c    ( b^{122, 4}_2 ∧  b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨  b^{122, 4}_0 ∨  p_488 ∨ break
c  in DIMACS:
-20102 -20103  20104  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 4}_2 ∧ -b^{122, 4}_1 ∧ -b^{122, 4}_0 ∧ true) 
c  in CNF:
c    -b^{122, 4}_2 ∨  b^{122, 4}_1 ∨  b^{122, 4}_0 ∨ false 
c  in DIMACS:
-20102  20103  20104  0

c  3 does not represent an automaton state.
c    -(-b^{122, 4}_2 ∧  b^{122, 4}_1 ∧  b^{122, 4}_0 ∧ true) 
c  in CNF:
c     b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ false 
c  in DIMACS:
 20102 -20103 -20104  0
c  -3 does not represent an automaton state.
c    -( b^{122, 4}_2 ∧  b^{122, 4}_1 ∧  b^{122, 4}_0 ∧ true) 
c  in CNF:
c    -b^{122, 4}_2 ∨ -b^{122, 4}_1 ∨ -b^{122, 4}_0 ∨ false 
c  in DIMACS:
-20102 -20103 -20104  0

c i = 5
c  -2+1 --> -1
c    ( b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧  p_610) -> ( b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0)
c  in CNF:
c    -b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨  b^{122, 6}_2
c    -b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_1
c    -b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨  b^{122, 6}_0
c  in DIMACS:
-20105 -20106  20107 -610  20108 0
-20105 -20106  20107 -610 -20109 0
-20105 -20106  20107 -610  20110 0

c  -1+1 --> 0
c    ( b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0 ∧  p_610) -> (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧ -b^{122, 6}_0)
c  in CNF:
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_2
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_1
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_0
c  in DIMACS:
-20105  20106 -20107 -610 -20108 0
-20105  20106 -20107 -610 -20109 0
-20105  20106 -20107 -610 -20110 0

c  0+1 --> 1
c    (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧  p_610) -> (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0)
c  in CNF:
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_2
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_1
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨  b^{122, 6}_0
c  in DIMACS:
 20105  20106  20107 -610 -20108 0
 20105  20106  20107 -610 -20109 0
 20105  20106  20107 -610  20110 0

c  1+1 --> 2
c    (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0 ∧  p_610) -> (-b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0)
c  in CNF:
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_2
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨  b^{122, 6}_1
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ -p_610 ∨ -b^{122, 6}_0
c  in DIMACS:
 20105  20106 -20107 -610 -20108 0
 20105  20106 -20107 -610  20109 0
 20105  20106 -20107 -610 -20110 0

c  2+1 --> break 
c    (-b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧  p_610) -> break
c  in CNF:
c     b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 20105 -20106  20107 -610 1162 0


c  2-1 --> 1
c    (-b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧ -p_610) -> (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0)
c  in CNF:
c     b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_2
c     b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_1
c     b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨  b^{122, 6}_0
c  in DIMACS:
 20105 -20106  20107  610 -20108 0
 20105 -20106  20107  610 -20109 0
 20105 -20106  20107  610  20110 0

c  1-1 --> 0
c    (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0 ∧ -p_610) -> (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧ -b^{122, 6}_0)
c  in CNF:
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_2
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_1
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_0
c  in DIMACS:
 20105  20106 -20107  610 -20108 0
 20105  20106 -20107  610 -20109 0
 20105  20106 -20107  610 -20110 0

c  0-1 --> -1
c    (-b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧ -p_610) -> ( b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0)
c  in CNF:
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨  b^{122, 6}_2
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_1
c     b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨  b^{122, 6}_0
c  in DIMACS:
 20105  20106  20107  610  20108 0
 20105  20106  20107  610 -20109 0
 20105  20106  20107  610  20110 0

c  -1-1 --> -2
c    ( b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧  b^{122, 5}_0 ∧ -p_610) -> ( b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0)
c  in CNF:
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨  b^{122, 6}_2
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨  b^{122, 6}_1
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨  p_610 ∨ -b^{122, 6}_0
c  in DIMACS:
-20105  20106 -20107  610  20108 0
-20105  20106 -20107  610  20109 0
-20105  20106 -20107  610 -20110 0

c  -2-1 --> break 
c    ( b^{122, 5}_2 ∧  b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨  b^{122, 5}_0 ∨  p_610 ∨ break
c  in DIMACS:
-20105 -20106  20107  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 5}_2 ∧ -b^{122, 5}_1 ∧ -b^{122, 5}_0 ∧ true) 
c  in CNF:
c    -b^{122, 5}_2 ∨  b^{122, 5}_1 ∨  b^{122, 5}_0 ∨ false 
c  in DIMACS:
-20105  20106  20107  0

c  3 does not represent an automaton state.
c    -(-b^{122, 5}_2 ∧  b^{122, 5}_1 ∧  b^{122, 5}_0 ∧ true) 
c  in CNF:
c     b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ false 
c  in DIMACS:
 20105 -20106 -20107  0
c  -3 does not represent an automaton state.
c    -( b^{122, 5}_2 ∧  b^{122, 5}_1 ∧  b^{122, 5}_0 ∧ true) 
c  in CNF:
c    -b^{122, 5}_2 ∨ -b^{122, 5}_1 ∨ -b^{122, 5}_0 ∨ false 
c  in DIMACS:
-20105 -20106 -20107  0

c i = 6
c  -2+1 --> -1
c    ( b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧  p_732) -> ( b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0)
c  in CNF:
c    -b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨  b^{122, 7}_2
c    -b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_1
c    -b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨  b^{122, 7}_0
c  in DIMACS:
-20108 -20109  20110 -732  20111 0
-20108 -20109  20110 -732 -20112 0
-20108 -20109  20110 -732  20113 0

c  -1+1 --> 0
c    ( b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0 ∧  p_732) -> (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧ -b^{122, 7}_0)
c  in CNF:
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_2
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_1
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_0
c  in DIMACS:
-20108  20109 -20110 -732 -20111 0
-20108  20109 -20110 -732 -20112 0
-20108  20109 -20110 -732 -20113 0

c  0+1 --> 1
c    (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧  p_732) -> (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0)
c  in CNF:
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_2
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_1
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨  b^{122, 7}_0
c  in DIMACS:
 20108  20109  20110 -732 -20111 0
 20108  20109  20110 -732 -20112 0
 20108  20109  20110 -732  20113 0

c  1+1 --> 2
c    (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0 ∧  p_732) -> (-b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0)
c  in CNF:
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_2
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨  b^{122, 7}_1
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ -p_732 ∨ -b^{122, 7}_0
c  in DIMACS:
 20108  20109 -20110 -732 -20111 0
 20108  20109 -20110 -732  20112 0
 20108  20109 -20110 -732 -20113 0

c  2+1 --> break 
c    (-b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧  p_732) -> break
c  in CNF:
c     b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 20108 -20109  20110 -732 1162 0


c  2-1 --> 1
c    (-b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧ -p_732) -> (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0)
c  in CNF:
c     b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_2
c     b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_1
c     b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨  b^{122, 7}_0
c  in DIMACS:
 20108 -20109  20110  732 -20111 0
 20108 -20109  20110  732 -20112 0
 20108 -20109  20110  732  20113 0

c  1-1 --> 0
c    (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0 ∧ -p_732) -> (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧ -b^{122, 7}_0)
c  in CNF:
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_2
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_1
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_0
c  in DIMACS:
 20108  20109 -20110  732 -20111 0
 20108  20109 -20110  732 -20112 0
 20108  20109 -20110  732 -20113 0

c  0-1 --> -1
c    (-b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧ -p_732) -> ( b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0)
c  in CNF:
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨  b^{122, 7}_2
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_1
c     b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨  b^{122, 7}_0
c  in DIMACS:
 20108  20109  20110  732  20111 0
 20108  20109  20110  732 -20112 0
 20108  20109  20110  732  20113 0

c  -1-1 --> -2
c    ( b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧  b^{122, 6}_0 ∧ -p_732) -> ( b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0)
c  in CNF:
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨  b^{122, 7}_2
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨  b^{122, 7}_1
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨  p_732 ∨ -b^{122, 7}_0
c  in DIMACS:
-20108  20109 -20110  732  20111 0
-20108  20109 -20110  732  20112 0
-20108  20109 -20110  732 -20113 0

c  -2-1 --> break 
c    ( b^{122, 6}_2 ∧  b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨  b^{122, 6}_0 ∨  p_732 ∨ break
c  in DIMACS:
-20108 -20109  20110  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 6}_2 ∧ -b^{122, 6}_1 ∧ -b^{122, 6}_0 ∧ true) 
c  in CNF:
c    -b^{122, 6}_2 ∨  b^{122, 6}_1 ∨  b^{122, 6}_0 ∨ false 
c  in DIMACS:
-20108  20109  20110  0

c  3 does not represent an automaton state.
c    -(-b^{122, 6}_2 ∧  b^{122, 6}_1 ∧  b^{122, 6}_0 ∧ true) 
c  in CNF:
c     b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ false 
c  in DIMACS:
 20108 -20109 -20110  0
c  -3 does not represent an automaton state.
c    -( b^{122, 6}_2 ∧  b^{122, 6}_1 ∧  b^{122, 6}_0 ∧ true) 
c  in CNF:
c    -b^{122, 6}_2 ∨ -b^{122, 6}_1 ∨ -b^{122, 6}_0 ∨ false 
c  in DIMACS:
-20108 -20109 -20110  0

c i = 7
c  -2+1 --> -1
c    ( b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧  p_854) -> ( b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0)
c  in CNF:
c    -b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨  b^{122, 8}_2
c    -b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_1
c    -b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨  b^{122, 8}_0
c  in DIMACS:
-20111 -20112  20113 -854  20114 0
-20111 -20112  20113 -854 -20115 0
-20111 -20112  20113 -854  20116 0

c  -1+1 --> 0
c    ( b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0 ∧  p_854) -> (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧ -b^{122, 8}_0)
c  in CNF:
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_2
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_1
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_0
c  in DIMACS:
-20111  20112 -20113 -854 -20114 0
-20111  20112 -20113 -854 -20115 0
-20111  20112 -20113 -854 -20116 0

c  0+1 --> 1
c    (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧  p_854) -> (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0)
c  in CNF:
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_2
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_1
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨  b^{122, 8}_0
c  in DIMACS:
 20111  20112  20113 -854 -20114 0
 20111  20112  20113 -854 -20115 0
 20111  20112  20113 -854  20116 0

c  1+1 --> 2
c    (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0 ∧  p_854) -> (-b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0)
c  in CNF:
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_2
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨  b^{122, 8}_1
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ -p_854 ∨ -b^{122, 8}_0
c  in DIMACS:
 20111  20112 -20113 -854 -20114 0
 20111  20112 -20113 -854  20115 0
 20111  20112 -20113 -854 -20116 0

c  2+1 --> break 
c    (-b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧  p_854) -> break
c  in CNF:
c     b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ -p_854 ∨ break
c  in DIMACS:
 20111 -20112  20113 -854 1162 0


c  2-1 --> 1
c    (-b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧ -p_854) -> (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0)
c  in CNF:
c     b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_2
c     b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_1
c     b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨  b^{122, 8}_0
c  in DIMACS:
 20111 -20112  20113  854 -20114 0
 20111 -20112  20113  854 -20115 0
 20111 -20112  20113  854  20116 0

c  1-1 --> 0
c    (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0 ∧ -p_854) -> (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧ -b^{122, 8}_0)
c  in CNF:
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_2
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_1
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_0
c  in DIMACS:
 20111  20112 -20113  854 -20114 0
 20111  20112 -20113  854 -20115 0
 20111  20112 -20113  854 -20116 0

c  0-1 --> -1
c    (-b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧ -p_854) -> ( b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0)
c  in CNF:
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨  b^{122, 8}_2
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_1
c     b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨  b^{122, 8}_0
c  in DIMACS:
 20111  20112  20113  854  20114 0
 20111  20112  20113  854 -20115 0
 20111  20112  20113  854  20116 0

c  -1-1 --> -2
c    ( b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧  b^{122, 7}_0 ∧ -p_854) -> ( b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0)
c  in CNF:
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨  b^{122, 8}_2
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨  b^{122, 8}_1
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨  p_854 ∨ -b^{122, 8}_0
c  in DIMACS:
-20111  20112 -20113  854  20114 0
-20111  20112 -20113  854  20115 0
-20111  20112 -20113  854 -20116 0

c  -2-1 --> break 
c    ( b^{122, 7}_2 ∧  b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧ -p_854) -> break
c  in CNF:
c    -b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨  b^{122, 7}_0 ∨  p_854 ∨ break
c  in DIMACS:
-20111 -20112  20113  854 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 7}_2 ∧ -b^{122, 7}_1 ∧ -b^{122, 7}_0 ∧ true) 
c  in CNF:
c    -b^{122, 7}_2 ∨  b^{122, 7}_1 ∨  b^{122, 7}_0 ∨ false 
c  in DIMACS:
-20111  20112  20113  0

c  3 does not represent an automaton state.
c    -(-b^{122, 7}_2 ∧  b^{122, 7}_1 ∧  b^{122, 7}_0 ∧ true) 
c  in CNF:
c     b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ false 
c  in DIMACS:
 20111 -20112 -20113  0
c  -3 does not represent an automaton state.
c    -( b^{122, 7}_2 ∧  b^{122, 7}_1 ∧  b^{122, 7}_0 ∧ true) 
c  in CNF:
c    -b^{122, 7}_2 ∨ -b^{122, 7}_1 ∨ -b^{122, 7}_0 ∨ false 
c  in DIMACS:
-20111 -20112 -20113  0

c i = 8
c  -2+1 --> -1
c    ( b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧  p_976) -> ( b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0)
c  in CNF:
c    -b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨  b^{122, 9}_2
c    -b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_1
c    -b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨  b^{122, 9}_0
c  in DIMACS:
-20114 -20115  20116 -976  20117 0
-20114 -20115  20116 -976 -20118 0
-20114 -20115  20116 -976  20119 0

c  -1+1 --> 0
c    ( b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0 ∧  p_976) -> (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧ -b^{122, 9}_0)
c  in CNF:
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_2
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_1
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_0
c  in DIMACS:
-20114  20115 -20116 -976 -20117 0
-20114  20115 -20116 -976 -20118 0
-20114  20115 -20116 -976 -20119 0

c  0+1 --> 1
c    (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧  p_976) -> (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0)
c  in CNF:
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_2
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_1
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨  b^{122, 9}_0
c  in DIMACS:
 20114  20115  20116 -976 -20117 0
 20114  20115  20116 -976 -20118 0
 20114  20115  20116 -976  20119 0

c  1+1 --> 2
c    (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0 ∧  p_976) -> (-b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0)
c  in CNF:
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_2
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨  b^{122, 9}_1
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ -p_976 ∨ -b^{122, 9}_0
c  in DIMACS:
 20114  20115 -20116 -976 -20117 0
 20114  20115 -20116 -976  20118 0
 20114  20115 -20116 -976 -20119 0

c  2+1 --> break 
c    (-b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧  p_976) -> break
c  in CNF:
c     b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 20114 -20115  20116 -976 1162 0


c  2-1 --> 1
c    (-b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧ -p_976) -> (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0)
c  in CNF:
c     b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_2
c     b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_1
c     b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨  b^{122, 9}_0
c  in DIMACS:
 20114 -20115  20116  976 -20117 0
 20114 -20115  20116  976 -20118 0
 20114 -20115  20116  976  20119 0

c  1-1 --> 0
c    (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0 ∧ -p_976) -> (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧ -b^{122, 9}_0)
c  in CNF:
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_2
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_1
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_0
c  in DIMACS:
 20114  20115 -20116  976 -20117 0
 20114  20115 -20116  976 -20118 0
 20114  20115 -20116  976 -20119 0

c  0-1 --> -1
c    (-b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧ -p_976) -> ( b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0)
c  in CNF:
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨  b^{122, 9}_2
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_1
c     b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨  b^{122, 9}_0
c  in DIMACS:
 20114  20115  20116  976  20117 0
 20114  20115  20116  976 -20118 0
 20114  20115  20116  976  20119 0

c  -1-1 --> -2
c    ( b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧  b^{122, 8}_0 ∧ -p_976) -> ( b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0)
c  in CNF:
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨  b^{122, 9}_2
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨  b^{122, 9}_1
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨  p_976 ∨ -b^{122, 9}_0
c  in DIMACS:
-20114  20115 -20116  976  20117 0
-20114  20115 -20116  976  20118 0
-20114  20115 -20116  976 -20119 0

c  -2-1 --> break 
c    ( b^{122, 8}_2 ∧  b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨  b^{122, 8}_0 ∨  p_976 ∨ break
c  in DIMACS:
-20114 -20115  20116  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 8}_2 ∧ -b^{122, 8}_1 ∧ -b^{122, 8}_0 ∧ true) 
c  in CNF:
c    -b^{122, 8}_2 ∨  b^{122, 8}_1 ∨  b^{122, 8}_0 ∨ false 
c  in DIMACS:
-20114  20115  20116  0

c  3 does not represent an automaton state.
c    -(-b^{122, 8}_2 ∧  b^{122, 8}_1 ∧  b^{122, 8}_0 ∧ true) 
c  in CNF:
c     b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ false 
c  in DIMACS:
 20114 -20115 -20116  0
c  -3 does not represent an automaton state.
c    -( b^{122, 8}_2 ∧  b^{122, 8}_1 ∧  b^{122, 8}_0 ∧ true) 
c  in CNF:
c    -b^{122, 8}_2 ∨ -b^{122, 8}_1 ∨ -b^{122, 8}_0 ∨ false 
c  in DIMACS:
-20114 -20115 -20116  0

c i = 9
c  -2+1 --> -1
c    ( b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧  p_1098) -> ( b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧  b^{122, 10}_0)
c  in CNF:
c    -b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨  b^{122, 10}_2
c    -b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_1
c    -b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨  b^{122, 10}_0
c  in DIMACS:
-20117 -20118  20119 -1098  20120 0
-20117 -20118  20119 -1098 -20121 0
-20117 -20118  20119 -1098  20122 0

c  -1+1 --> 0
c    ( b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0 ∧  p_1098) -> (-b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧ -b^{122, 10}_0)
c  in CNF:
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_2
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_1
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_0
c  in DIMACS:
-20117  20118 -20119 -1098 -20120 0
-20117  20118 -20119 -1098 -20121 0
-20117  20118 -20119 -1098 -20122 0

c  0+1 --> 1
c    (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧  p_1098) -> (-b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧  b^{122, 10}_0)
c  in CNF:
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_2
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_1
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨  b^{122, 10}_0
c  in DIMACS:
 20117  20118  20119 -1098 -20120 0
 20117  20118  20119 -1098 -20121 0
 20117  20118  20119 -1098  20122 0

c  1+1 --> 2
c    (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0 ∧  p_1098) -> (-b^{122, 10}_2 ∧  b^{122, 10}_1 ∧ -b^{122, 10}_0)
c  in CNF:
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_2
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨  b^{122, 10}_1
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ -p_1098 ∨ -b^{122, 10}_0
c  in DIMACS:
 20117  20118 -20119 -1098 -20120 0
 20117  20118 -20119 -1098  20121 0
 20117  20118 -20119 -1098 -20122 0

c  2+1 --> break 
c    (-b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 20117 -20118  20119 -1098 1162 0


c  2-1 --> 1
c    (-b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧ -p_1098) -> (-b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧  b^{122, 10}_0)
c  in CNF:
c     b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_2
c     b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_1
c     b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨  b^{122, 10}_0
c  in DIMACS:
 20117 -20118  20119  1098 -20120 0
 20117 -20118  20119  1098 -20121 0
 20117 -20118  20119  1098  20122 0

c  1-1 --> 0
c    (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0 ∧ -p_1098) -> (-b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧ -b^{122, 10}_0)
c  in CNF:
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_2
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_1
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_0
c  in DIMACS:
 20117  20118 -20119  1098 -20120 0
 20117  20118 -20119  1098 -20121 0
 20117  20118 -20119  1098 -20122 0

c  0-1 --> -1
c    (-b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧ -p_1098) -> ( b^{122, 10}_2 ∧ -b^{122, 10}_1 ∧  b^{122, 10}_0)
c  in CNF:
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨  b^{122, 10}_2
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_1
c     b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨  b^{122, 10}_0
c  in DIMACS:
 20117  20118  20119  1098  20120 0
 20117  20118  20119  1098 -20121 0
 20117  20118  20119  1098  20122 0

c  -1-1 --> -2
c    ( b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧  b^{122, 9}_0 ∧ -p_1098) -> ( b^{122, 10}_2 ∧  b^{122, 10}_1 ∧ -b^{122, 10}_0)
c  in CNF:
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨  b^{122, 10}_2
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨  b^{122, 10}_1
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨  p_1098 ∨ -b^{122, 10}_0
c  in DIMACS:
-20117  20118 -20119  1098  20120 0
-20117  20118 -20119  1098  20121 0
-20117  20118 -20119  1098 -20122 0

c  -2-1 --> break 
c    ( b^{122, 9}_2 ∧  b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨  b^{122, 9}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-20117 -20118  20119  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{122, 9}_2 ∧ -b^{122, 9}_1 ∧ -b^{122, 9}_0 ∧ true) 
c  in CNF:
c    -b^{122, 9}_2 ∨  b^{122, 9}_1 ∨  b^{122, 9}_0 ∨ false 
c  in DIMACS:
-20117  20118  20119  0

c  3 does not represent an automaton state.
c    -(-b^{122, 9}_2 ∧  b^{122, 9}_1 ∧  b^{122, 9}_0 ∧ true) 
c  in CNF:
c     b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ false 
c  in DIMACS:
 20117 -20118 -20119  0
c  -3 does not represent an automaton state.
c    -( b^{122, 9}_2 ∧  b^{122, 9}_1 ∧  b^{122, 9}_0 ∧ true) 
c  in CNF:
c    -b^{122, 9}_2 ∨ -b^{122, 9}_1 ∨ -b^{122, 9}_0 ∨ false 
c  in DIMACS:
-20117 -20118 -20119  0

c INIT for k = 123
c    -b^{123, 1}_2
c    -b^{123, 1}_1
c    -b^{123, 1}_0
c  in DIMACS:
-20123 0
-20124 0
-20125 0

c Transitions for k = 123
c i = 1
c  -2+1 --> -1
c    ( b^{123, 1}_2 ∧  b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧  p_123) -> ( b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0)
c  in CNF:
c    -b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨  b^{123, 2}_2
c    -b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_1
c    -b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨  b^{123, 2}_0
c  in DIMACS:
-20123 -20124  20125 -123  20126 0
-20123 -20124  20125 -123 -20127 0
-20123 -20124  20125 -123  20128 0

c  -1+1 --> 0
c    ( b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧  b^{123, 1}_0 ∧  p_123) -> (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧ -b^{123, 2}_0)
c  in CNF:
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_2
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_1
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_0
c  in DIMACS:
-20123  20124 -20125 -123 -20126 0
-20123  20124 -20125 -123 -20127 0
-20123  20124 -20125 -123 -20128 0

c  0+1 --> 1
c    (-b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧  p_123) -> (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0)
c  in CNF:
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_2
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_1
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨  b^{123, 2}_0
c  in DIMACS:
 20123  20124  20125 -123 -20126 0
 20123  20124  20125 -123 -20127 0
 20123  20124  20125 -123  20128 0

c  1+1 --> 2
c    (-b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧  b^{123, 1}_0 ∧  p_123) -> (-b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0)
c  in CNF:
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_2
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨  b^{123, 2}_1
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ -p_123 ∨ -b^{123, 2}_0
c  in DIMACS:
 20123  20124 -20125 -123 -20126 0
 20123  20124 -20125 -123  20127 0
 20123  20124 -20125 -123 -20128 0

c  2+1 --> break 
c    (-b^{123, 1}_2 ∧  b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧  p_123) -> break
c  in CNF:
c     b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ -p_123 ∨ break
c  in DIMACS:
 20123 -20124  20125 -123 1162 0


c  2-1 --> 1
c    (-b^{123, 1}_2 ∧  b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧ -p_123) -> (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0)
c  in CNF:
c     b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_2
c     b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_1
c     b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨  b^{123, 2}_0
c  in DIMACS:
 20123 -20124  20125  123 -20126 0
 20123 -20124  20125  123 -20127 0
 20123 -20124  20125  123  20128 0

c  1-1 --> 0
c    (-b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧  b^{123, 1}_0 ∧ -p_123) -> (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧ -b^{123, 2}_0)
c  in CNF:
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_2
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_1
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_0
c  in DIMACS:
 20123  20124 -20125  123 -20126 0
 20123  20124 -20125  123 -20127 0
 20123  20124 -20125  123 -20128 0

c  0-1 --> -1
c    (-b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧ -p_123) -> ( b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0)
c  in CNF:
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨  b^{123, 2}_2
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_1
c     b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨  b^{123, 2}_0
c  in DIMACS:
 20123  20124  20125  123  20126 0
 20123  20124  20125  123 -20127 0
 20123  20124  20125  123  20128 0

c  -1-1 --> -2
c    ( b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧  b^{123, 1}_0 ∧ -p_123) -> ( b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0)
c  in CNF:
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨  b^{123, 2}_2
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨  b^{123, 2}_1
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨  p_123 ∨ -b^{123, 2}_0
c  in DIMACS:
-20123  20124 -20125  123  20126 0
-20123  20124 -20125  123  20127 0
-20123  20124 -20125  123 -20128 0

c  -2-1 --> break 
c    ( b^{123, 1}_2 ∧  b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧ -p_123) -> break
c  in CNF:
c    -b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨  b^{123, 1}_0 ∨  p_123 ∨ break
c  in DIMACS:
-20123 -20124  20125  123 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 1}_2 ∧ -b^{123, 1}_1 ∧ -b^{123, 1}_0 ∧ true) 
c  in CNF:
c    -b^{123, 1}_2 ∨  b^{123, 1}_1 ∨  b^{123, 1}_0 ∨ false 
c  in DIMACS:
-20123  20124  20125  0

c  3 does not represent an automaton state.
c    -(-b^{123, 1}_2 ∧  b^{123, 1}_1 ∧  b^{123, 1}_0 ∧ true) 
c  in CNF:
c     b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ false 
c  in DIMACS:
 20123 -20124 -20125  0
c  -3 does not represent an automaton state.
c    -( b^{123, 1}_2 ∧  b^{123, 1}_1 ∧  b^{123, 1}_0 ∧ true) 
c  in CNF:
c    -b^{123, 1}_2 ∨ -b^{123, 1}_1 ∨ -b^{123, 1}_0 ∨ false 
c  in DIMACS:
-20123 -20124 -20125  0

c i = 2
c  -2+1 --> -1
c    ( b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧  p_246) -> ( b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0)
c  in CNF:
c    -b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨  b^{123, 3}_2
c    -b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_1
c    -b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨  b^{123, 3}_0
c  in DIMACS:
-20126 -20127  20128 -246  20129 0
-20126 -20127  20128 -246 -20130 0
-20126 -20127  20128 -246  20131 0

c  -1+1 --> 0
c    ( b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0 ∧  p_246) -> (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧ -b^{123, 3}_0)
c  in CNF:
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_2
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_1
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_0
c  in DIMACS:
-20126  20127 -20128 -246 -20129 0
-20126  20127 -20128 -246 -20130 0
-20126  20127 -20128 -246 -20131 0

c  0+1 --> 1
c    (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧  p_246) -> (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0)
c  in CNF:
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_2
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_1
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨  b^{123, 3}_0
c  in DIMACS:
 20126  20127  20128 -246 -20129 0
 20126  20127  20128 -246 -20130 0
 20126  20127  20128 -246  20131 0

c  1+1 --> 2
c    (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0 ∧  p_246) -> (-b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0)
c  in CNF:
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_2
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨  b^{123, 3}_1
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ -p_246 ∨ -b^{123, 3}_0
c  in DIMACS:
 20126  20127 -20128 -246 -20129 0
 20126  20127 -20128 -246  20130 0
 20126  20127 -20128 -246 -20131 0

c  2+1 --> break 
c    (-b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧  p_246) -> break
c  in CNF:
c     b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 20126 -20127  20128 -246 1162 0


c  2-1 --> 1
c    (-b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧ -p_246) -> (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0)
c  in CNF:
c     b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_2
c     b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_1
c     b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨  b^{123, 3}_0
c  in DIMACS:
 20126 -20127  20128  246 -20129 0
 20126 -20127  20128  246 -20130 0
 20126 -20127  20128  246  20131 0

c  1-1 --> 0
c    (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0 ∧ -p_246) -> (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧ -b^{123, 3}_0)
c  in CNF:
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_2
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_1
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_0
c  in DIMACS:
 20126  20127 -20128  246 -20129 0
 20126  20127 -20128  246 -20130 0
 20126  20127 -20128  246 -20131 0

c  0-1 --> -1
c    (-b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧ -p_246) -> ( b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0)
c  in CNF:
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨  b^{123, 3}_2
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_1
c     b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨  b^{123, 3}_0
c  in DIMACS:
 20126  20127  20128  246  20129 0
 20126  20127  20128  246 -20130 0
 20126  20127  20128  246  20131 0

c  -1-1 --> -2
c    ( b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧  b^{123, 2}_0 ∧ -p_246) -> ( b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0)
c  in CNF:
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨  b^{123, 3}_2
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨  b^{123, 3}_1
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨  p_246 ∨ -b^{123, 3}_0
c  in DIMACS:
-20126  20127 -20128  246  20129 0
-20126  20127 -20128  246  20130 0
-20126  20127 -20128  246 -20131 0

c  -2-1 --> break 
c    ( b^{123, 2}_2 ∧  b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨  b^{123, 2}_0 ∨  p_246 ∨ break
c  in DIMACS:
-20126 -20127  20128  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 2}_2 ∧ -b^{123, 2}_1 ∧ -b^{123, 2}_0 ∧ true) 
c  in CNF:
c    -b^{123, 2}_2 ∨  b^{123, 2}_1 ∨  b^{123, 2}_0 ∨ false 
c  in DIMACS:
-20126  20127  20128  0

c  3 does not represent an automaton state.
c    -(-b^{123, 2}_2 ∧  b^{123, 2}_1 ∧  b^{123, 2}_0 ∧ true) 
c  in CNF:
c     b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ false 
c  in DIMACS:
 20126 -20127 -20128  0
c  -3 does not represent an automaton state.
c    -( b^{123, 2}_2 ∧  b^{123, 2}_1 ∧  b^{123, 2}_0 ∧ true) 
c  in CNF:
c    -b^{123, 2}_2 ∨ -b^{123, 2}_1 ∨ -b^{123, 2}_0 ∨ false 
c  in DIMACS:
-20126 -20127 -20128  0

c i = 3
c  -2+1 --> -1
c    ( b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧  p_369) -> ( b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0)
c  in CNF:
c    -b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨  b^{123, 4}_2
c    -b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_1
c    -b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨  b^{123, 4}_0
c  in DIMACS:
-20129 -20130  20131 -369  20132 0
-20129 -20130  20131 -369 -20133 0
-20129 -20130  20131 -369  20134 0

c  -1+1 --> 0
c    ( b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0 ∧  p_369) -> (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧ -b^{123, 4}_0)
c  in CNF:
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_2
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_1
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_0
c  in DIMACS:
-20129  20130 -20131 -369 -20132 0
-20129  20130 -20131 -369 -20133 0
-20129  20130 -20131 -369 -20134 0

c  0+1 --> 1
c    (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧  p_369) -> (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0)
c  in CNF:
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_2
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_1
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨  b^{123, 4}_0
c  in DIMACS:
 20129  20130  20131 -369 -20132 0
 20129  20130  20131 -369 -20133 0
 20129  20130  20131 -369  20134 0

c  1+1 --> 2
c    (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0 ∧  p_369) -> (-b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0)
c  in CNF:
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_2
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨  b^{123, 4}_1
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ -p_369 ∨ -b^{123, 4}_0
c  in DIMACS:
 20129  20130 -20131 -369 -20132 0
 20129  20130 -20131 -369  20133 0
 20129  20130 -20131 -369 -20134 0

c  2+1 --> break 
c    (-b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧  p_369) -> break
c  in CNF:
c     b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 20129 -20130  20131 -369 1162 0


c  2-1 --> 1
c    (-b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧ -p_369) -> (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0)
c  in CNF:
c     b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_2
c     b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_1
c     b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨  b^{123, 4}_0
c  in DIMACS:
 20129 -20130  20131  369 -20132 0
 20129 -20130  20131  369 -20133 0
 20129 -20130  20131  369  20134 0

c  1-1 --> 0
c    (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0 ∧ -p_369) -> (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧ -b^{123, 4}_0)
c  in CNF:
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_2
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_1
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_0
c  in DIMACS:
 20129  20130 -20131  369 -20132 0
 20129  20130 -20131  369 -20133 0
 20129  20130 -20131  369 -20134 0

c  0-1 --> -1
c    (-b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧ -p_369) -> ( b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0)
c  in CNF:
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨  b^{123, 4}_2
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_1
c     b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨  b^{123, 4}_0
c  in DIMACS:
 20129  20130  20131  369  20132 0
 20129  20130  20131  369 -20133 0
 20129  20130  20131  369  20134 0

c  -1-1 --> -2
c    ( b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧  b^{123, 3}_0 ∧ -p_369) -> ( b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0)
c  in CNF:
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨  b^{123, 4}_2
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨  b^{123, 4}_1
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨  p_369 ∨ -b^{123, 4}_0
c  in DIMACS:
-20129  20130 -20131  369  20132 0
-20129  20130 -20131  369  20133 0
-20129  20130 -20131  369 -20134 0

c  -2-1 --> break 
c    ( b^{123, 3}_2 ∧  b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨  b^{123, 3}_0 ∨  p_369 ∨ break
c  in DIMACS:
-20129 -20130  20131  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 3}_2 ∧ -b^{123, 3}_1 ∧ -b^{123, 3}_0 ∧ true) 
c  in CNF:
c    -b^{123, 3}_2 ∨  b^{123, 3}_1 ∨  b^{123, 3}_0 ∨ false 
c  in DIMACS:
-20129  20130  20131  0

c  3 does not represent an automaton state.
c    -(-b^{123, 3}_2 ∧  b^{123, 3}_1 ∧  b^{123, 3}_0 ∧ true) 
c  in CNF:
c     b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ false 
c  in DIMACS:
 20129 -20130 -20131  0
c  -3 does not represent an automaton state.
c    -( b^{123, 3}_2 ∧  b^{123, 3}_1 ∧  b^{123, 3}_0 ∧ true) 
c  in CNF:
c    -b^{123, 3}_2 ∨ -b^{123, 3}_1 ∨ -b^{123, 3}_0 ∨ false 
c  in DIMACS:
-20129 -20130 -20131  0

c i = 4
c  -2+1 --> -1
c    ( b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧  p_492) -> ( b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0)
c  in CNF:
c    -b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨  b^{123, 5}_2
c    -b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_1
c    -b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨  b^{123, 5}_0
c  in DIMACS:
-20132 -20133  20134 -492  20135 0
-20132 -20133  20134 -492 -20136 0
-20132 -20133  20134 -492  20137 0

c  -1+1 --> 0
c    ( b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0 ∧  p_492) -> (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧ -b^{123, 5}_0)
c  in CNF:
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_2
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_1
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_0
c  in DIMACS:
-20132  20133 -20134 -492 -20135 0
-20132  20133 -20134 -492 -20136 0
-20132  20133 -20134 -492 -20137 0

c  0+1 --> 1
c    (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧  p_492) -> (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0)
c  in CNF:
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_2
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_1
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨  b^{123, 5}_0
c  in DIMACS:
 20132  20133  20134 -492 -20135 0
 20132  20133  20134 -492 -20136 0
 20132  20133  20134 -492  20137 0

c  1+1 --> 2
c    (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0 ∧  p_492) -> (-b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0)
c  in CNF:
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_2
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨  b^{123, 5}_1
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ -p_492 ∨ -b^{123, 5}_0
c  in DIMACS:
 20132  20133 -20134 -492 -20135 0
 20132  20133 -20134 -492  20136 0
 20132  20133 -20134 -492 -20137 0

c  2+1 --> break 
c    (-b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧  p_492) -> break
c  in CNF:
c     b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 20132 -20133  20134 -492 1162 0


c  2-1 --> 1
c    (-b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧ -p_492) -> (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0)
c  in CNF:
c     b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_2
c     b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_1
c     b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨  b^{123, 5}_0
c  in DIMACS:
 20132 -20133  20134  492 -20135 0
 20132 -20133  20134  492 -20136 0
 20132 -20133  20134  492  20137 0

c  1-1 --> 0
c    (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0 ∧ -p_492) -> (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧ -b^{123, 5}_0)
c  in CNF:
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_2
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_1
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_0
c  in DIMACS:
 20132  20133 -20134  492 -20135 0
 20132  20133 -20134  492 -20136 0
 20132  20133 -20134  492 -20137 0

c  0-1 --> -1
c    (-b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧ -p_492) -> ( b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0)
c  in CNF:
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨  b^{123, 5}_2
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_1
c     b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨  b^{123, 5}_0
c  in DIMACS:
 20132  20133  20134  492  20135 0
 20132  20133  20134  492 -20136 0
 20132  20133  20134  492  20137 0

c  -1-1 --> -2
c    ( b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧  b^{123, 4}_0 ∧ -p_492) -> ( b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0)
c  in CNF:
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨  b^{123, 5}_2
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨  b^{123, 5}_1
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨  p_492 ∨ -b^{123, 5}_0
c  in DIMACS:
-20132  20133 -20134  492  20135 0
-20132  20133 -20134  492  20136 0
-20132  20133 -20134  492 -20137 0

c  -2-1 --> break 
c    ( b^{123, 4}_2 ∧  b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨  b^{123, 4}_0 ∨  p_492 ∨ break
c  in DIMACS:
-20132 -20133  20134  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 4}_2 ∧ -b^{123, 4}_1 ∧ -b^{123, 4}_0 ∧ true) 
c  in CNF:
c    -b^{123, 4}_2 ∨  b^{123, 4}_1 ∨  b^{123, 4}_0 ∨ false 
c  in DIMACS:
-20132  20133  20134  0

c  3 does not represent an automaton state.
c    -(-b^{123, 4}_2 ∧  b^{123, 4}_1 ∧  b^{123, 4}_0 ∧ true) 
c  in CNF:
c     b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ false 
c  in DIMACS:
 20132 -20133 -20134  0
c  -3 does not represent an automaton state.
c    -( b^{123, 4}_2 ∧  b^{123, 4}_1 ∧  b^{123, 4}_0 ∧ true) 
c  in CNF:
c    -b^{123, 4}_2 ∨ -b^{123, 4}_1 ∨ -b^{123, 4}_0 ∨ false 
c  in DIMACS:
-20132 -20133 -20134  0

c i = 5
c  -2+1 --> -1
c    ( b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧  p_615) -> ( b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0)
c  in CNF:
c    -b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨  b^{123, 6}_2
c    -b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_1
c    -b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨  b^{123, 6}_0
c  in DIMACS:
-20135 -20136  20137 -615  20138 0
-20135 -20136  20137 -615 -20139 0
-20135 -20136  20137 -615  20140 0

c  -1+1 --> 0
c    ( b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0 ∧  p_615) -> (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧ -b^{123, 6}_0)
c  in CNF:
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_2
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_1
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_0
c  in DIMACS:
-20135  20136 -20137 -615 -20138 0
-20135  20136 -20137 -615 -20139 0
-20135  20136 -20137 -615 -20140 0

c  0+1 --> 1
c    (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧  p_615) -> (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0)
c  in CNF:
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_2
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_1
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨  b^{123, 6}_0
c  in DIMACS:
 20135  20136  20137 -615 -20138 0
 20135  20136  20137 -615 -20139 0
 20135  20136  20137 -615  20140 0

c  1+1 --> 2
c    (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0 ∧  p_615) -> (-b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0)
c  in CNF:
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_2
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨  b^{123, 6}_1
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ -p_615 ∨ -b^{123, 6}_0
c  in DIMACS:
 20135  20136 -20137 -615 -20138 0
 20135  20136 -20137 -615  20139 0
 20135  20136 -20137 -615 -20140 0

c  2+1 --> break 
c    (-b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧  p_615) -> break
c  in CNF:
c     b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 20135 -20136  20137 -615 1162 0


c  2-1 --> 1
c    (-b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧ -p_615) -> (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0)
c  in CNF:
c     b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_2
c     b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_1
c     b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨  b^{123, 6}_0
c  in DIMACS:
 20135 -20136  20137  615 -20138 0
 20135 -20136  20137  615 -20139 0
 20135 -20136  20137  615  20140 0

c  1-1 --> 0
c    (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0 ∧ -p_615) -> (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧ -b^{123, 6}_0)
c  in CNF:
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_2
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_1
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_0
c  in DIMACS:
 20135  20136 -20137  615 -20138 0
 20135  20136 -20137  615 -20139 0
 20135  20136 -20137  615 -20140 0

c  0-1 --> -1
c    (-b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧ -p_615) -> ( b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0)
c  in CNF:
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨  b^{123, 6}_2
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_1
c     b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨  b^{123, 6}_0
c  in DIMACS:
 20135  20136  20137  615  20138 0
 20135  20136  20137  615 -20139 0
 20135  20136  20137  615  20140 0

c  -1-1 --> -2
c    ( b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧  b^{123, 5}_0 ∧ -p_615) -> ( b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0)
c  in CNF:
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨  b^{123, 6}_2
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨  b^{123, 6}_1
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨  p_615 ∨ -b^{123, 6}_0
c  in DIMACS:
-20135  20136 -20137  615  20138 0
-20135  20136 -20137  615  20139 0
-20135  20136 -20137  615 -20140 0

c  -2-1 --> break 
c    ( b^{123, 5}_2 ∧  b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨  b^{123, 5}_0 ∨  p_615 ∨ break
c  in DIMACS:
-20135 -20136  20137  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 5}_2 ∧ -b^{123, 5}_1 ∧ -b^{123, 5}_0 ∧ true) 
c  in CNF:
c    -b^{123, 5}_2 ∨  b^{123, 5}_1 ∨  b^{123, 5}_0 ∨ false 
c  in DIMACS:
-20135  20136  20137  0

c  3 does not represent an automaton state.
c    -(-b^{123, 5}_2 ∧  b^{123, 5}_1 ∧  b^{123, 5}_0 ∧ true) 
c  in CNF:
c     b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ false 
c  in DIMACS:
 20135 -20136 -20137  0
c  -3 does not represent an automaton state.
c    -( b^{123, 5}_2 ∧  b^{123, 5}_1 ∧  b^{123, 5}_0 ∧ true) 
c  in CNF:
c    -b^{123, 5}_2 ∨ -b^{123, 5}_1 ∨ -b^{123, 5}_0 ∨ false 
c  in DIMACS:
-20135 -20136 -20137  0

c i = 6
c  -2+1 --> -1
c    ( b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧  p_738) -> ( b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0)
c  in CNF:
c    -b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨  b^{123, 7}_2
c    -b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_1
c    -b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨  b^{123, 7}_0
c  in DIMACS:
-20138 -20139  20140 -738  20141 0
-20138 -20139  20140 -738 -20142 0
-20138 -20139  20140 -738  20143 0

c  -1+1 --> 0
c    ( b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0 ∧  p_738) -> (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧ -b^{123, 7}_0)
c  in CNF:
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_2
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_1
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_0
c  in DIMACS:
-20138  20139 -20140 -738 -20141 0
-20138  20139 -20140 -738 -20142 0
-20138  20139 -20140 -738 -20143 0

c  0+1 --> 1
c    (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧  p_738) -> (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0)
c  in CNF:
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_2
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_1
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨  b^{123, 7}_0
c  in DIMACS:
 20138  20139  20140 -738 -20141 0
 20138  20139  20140 -738 -20142 0
 20138  20139  20140 -738  20143 0

c  1+1 --> 2
c    (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0 ∧  p_738) -> (-b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0)
c  in CNF:
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_2
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨  b^{123, 7}_1
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ -p_738 ∨ -b^{123, 7}_0
c  in DIMACS:
 20138  20139 -20140 -738 -20141 0
 20138  20139 -20140 -738  20142 0
 20138  20139 -20140 -738 -20143 0

c  2+1 --> break 
c    (-b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧  p_738) -> break
c  in CNF:
c     b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 20138 -20139  20140 -738 1162 0


c  2-1 --> 1
c    (-b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧ -p_738) -> (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0)
c  in CNF:
c     b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_2
c     b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_1
c     b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨  b^{123, 7}_0
c  in DIMACS:
 20138 -20139  20140  738 -20141 0
 20138 -20139  20140  738 -20142 0
 20138 -20139  20140  738  20143 0

c  1-1 --> 0
c    (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0 ∧ -p_738) -> (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧ -b^{123, 7}_0)
c  in CNF:
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_2
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_1
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_0
c  in DIMACS:
 20138  20139 -20140  738 -20141 0
 20138  20139 -20140  738 -20142 0
 20138  20139 -20140  738 -20143 0

c  0-1 --> -1
c    (-b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧ -p_738) -> ( b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0)
c  in CNF:
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨  b^{123, 7}_2
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_1
c     b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨  b^{123, 7}_0
c  in DIMACS:
 20138  20139  20140  738  20141 0
 20138  20139  20140  738 -20142 0
 20138  20139  20140  738  20143 0

c  -1-1 --> -2
c    ( b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧  b^{123, 6}_0 ∧ -p_738) -> ( b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0)
c  in CNF:
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨  b^{123, 7}_2
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨  b^{123, 7}_1
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨  p_738 ∨ -b^{123, 7}_0
c  in DIMACS:
-20138  20139 -20140  738  20141 0
-20138  20139 -20140  738  20142 0
-20138  20139 -20140  738 -20143 0

c  -2-1 --> break 
c    ( b^{123, 6}_2 ∧  b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨  b^{123, 6}_0 ∨  p_738 ∨ break
c  in DIMACS:
-20138 -20139  20140  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 6}_2 ∧ -b^{123, 6}_1 ∧ -b^{123, 6}_0 ∧ true) 
c  in CNF:
c    -b^{123, 6}_2 ∨  b^{123, 6}_1 ∨  b^{123, 6}_0 ∨ false 
c  in DIMACS:
-20138  20139  20140  0

c  3 does not represent an automaton state.
c    -(-b^{123, 6}_2 ∧  b^{123, 6}_1 ∧  b^{123, 6}_0 ∧ true) 
c  in CNF:
c     b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ false 
c  in DIMACS:
 20138 -20139 -20140  0
c  -3 does not represent an automaton state.
c    -( b^{123, 6}_2 ∧  b^{123, 6}_1 ∧  b^{123, 6}_0 ∧ true) 
c  in CNF:
c    -b^{123, 6}_2 ∨ -b^{123, 6}_1 ∨ -b^{123, 6}_0 ∨ false 
c  in DIMACS:
-20138 -20139 -20140  0

c i = 7
c  -2+1 --> -1
c    ( b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧  p_861) -> ( b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0)
c  in CNF:
c    -b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨  b^{123, 8}_2
c    -b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_1
c    -b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨  b^{123, 8}_0
c  in DIMACS:
-20141 -20142  20143 -861  20144 0
-20141 -20142  20143 -861 -20145 0
-20141 -20142  20143 -861  20146 0

c  -1+1 --> 0
c    ( b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0 ∧  p_861) -> (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧ -b^{123, 8}_0)
c  in CNF:
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_2
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_1
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_0
c  in DIMACS:
-20141  20142 -20143 -861 -20144 0
-20141  20142 -20143 -861 -20145 0
-20141  20142 -20143 -861 -20146 0

c  0+1 --> 1
c    (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧  p_861) -> (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0)
c  in CNF:
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_2
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_1
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨  b^{123, 8}_0
c  in DIMACS:
 20141  20142  20143 -861 -20144 0
 20141  20142  20143 -861 -20145 0
 20141  20142  20143 -861  20146 0

c  1+1 --> 2
c    (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0 ∧  p_861) -> (-b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0)
c  in CNF:
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_2
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨  b^{123, 8}_1
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ -p_861 ∨ -b^{123, 8}_0
c  in DIMACS:
 20141  20142 -20143 -861 -20144 0
 20141  20142 -20143 -861  20145 0
 20141  20142 -20143 -861 -20146 0

c  2+1 --> break 
c    (-b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧  p_861) -> break
c  in CNF:
c     b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 20141 -20142  20143 -861 1162 0


c  2-1 --> 1
c    (-b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧ -p_861) -> (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0)
c  in CNF:
c     b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_2
c     b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_1
c     b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨  b^{123, 8}_0
c  in DIMACS:
 20141 -20142  20143  861 -20144 0
 20141 -20142  20143  861 -20145 0
 20141 -20142  20143  861  20146 0

c  1-1 --> 0
c    (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0 ∧ -p_861) -> (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧ -b^{123, 8}_0)
c  in CNF:
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_2
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_1
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_0
c  in DIMACS:
 20141  20142 -20143  861 -20144 0
 20141  20142 -20143  861 -20145 0
 20141  20142 -20143  861 -20146 0

c  0-1 --> -1
c    (-b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧ -p_861) -> ( b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0)
c  in CNF:
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨  b^{123, 8}_2
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_1
c     b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨  b^{123, 8}_0
c  in DIMACS:
 20141  20142  20143  861  20144 0
 20141  20142  20143  861 -20145 0
 20141  20142  20143  861  20146 0

c  -1-1 --> -2
c    ( b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧  b^{123, 7}_0 ∧ -p_861) -> ( b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0)
c  in CNF:
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨  b^{123, 8}_2
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨  b^{123, 8}_1
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨  p_861 ∨ -b^{123, 8}_0
c  in DIMACS:
-20141  20142 -20143  861  20144 0
-20141  20142 -20143  861  20145 0
-20141  20142 -20143  861 -20146 0

c  -2-1 --> break 
c    ( b^{123, 7}_2 ∧  b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨  b^{123, 7}_0 ∨  p_861 ∨ break
c  in DIMACS:
-20141 -20142  20143  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 7}_2 ∧ -b^{123, 7}_1 ∧ -b^{123, 7}_0 ∧ true) 
c  in CNF:
c    -b^{123, 7}_2 ∨  b^{123, 7}_1 ∨  b^{123, 7}_0 ∨ false 
c  in DIMACS:
-20141  20142  20143  0

c  3 does not represent an automaton state.
c    -(-b^{123, 7}_2 ∧  b^{123, 7}_1 ∧  b^{123, 7}_0 ∧ true) 
c  in CNF:
c     b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ false 
c  in DIMACS:
 20141 -20142 -20143  0
c  -3 does not represent an automaton state.
c    -( b^{123, 7}_2 ∧  b^{123, 7}_1 ∧  b^{123, 7}_0 ∧ true) 
c  in CNF:
c    -b^{123, 7}_2 ∨ -b^{123, 7}_1 ∨ -b^{123, 7}_0 ∨ false 
c  in DIMACS:
-20141 -20142 -20143  0

c i = 8
c  -2+1 --> -1
c    ( b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧  p_984) -> ( b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0)
c  in CNF:
c    -b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨  b^{123, 9}_2
c    -b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_1
c    -b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨  b^{123, 9}_0
c  in DIMACS:
-20144 -20145  20146 -984  20147 0
-20144 -20145  20146 -984 -20148 0
-20144 -20145  20146 -984  20149 0

c  -1+1 --> 0
c    ( b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0 ∧  p_984) -> (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧ -b^{123, 9}_0)
c  in CNF:
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_2
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_1
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_0
c  in DIMACS:
-20144  20145 -20146 -984 -20147 0
-20144  20145 -20146 -984 -20148 0
-20144  20145 -20146 -984 -20149 0

c  0+1 --> 1
c    (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧  p_984) -> (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0)
c  in CNF:
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_2
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_1
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨  b^{123, 9}_0
c  in DIMACS:
 20144  20145  20146 -984 -20147 0
 20144  20145  20146 -984 -20148 0
 20144  20145  20146 -984  20149 0

c  1+1 --> 2
c    (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0 ∧  p_984) -> (-b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0)
c  in CNF:
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_2
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨  b^{123, 9}_1
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ -p_984 ∨ -b^{123, 9}_0
c  in DIMACS:
 20144  20145 -20146 -984 -20147 0
 20144  20145 -20146 -984  20148 0
 20144  20145 -20146 -984 -20149 0

c  2+1 --> break 
c    (-b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧  p_984) -> break
c  in CNF:
c     b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 20144 -20145  20146 -984 1162 0


c  2-1 --> 1
c    (-b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧ -p_984) -> (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0)
c  in CNF:
c     b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_2
c     b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_1
c     b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨  b^{123, 9}_0
c  in DIMACS:
 20144 -20145  20146  984 -20147 0
 20144 -20145  20146  984 -20148 0
 20144 -20145  20146  984  20149 0

c  1-1 --> 0
c    (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0 ∧ -p_984) -> (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧ -b^{123, 9}_0)
c  in CNF:
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_2
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_1
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_0
c  in DIMACS:
 20144  20145 -20146  984 -20147 0
 20144  20145 -20146  984 -20148 0
 20144  20145 -20146  984 -20149 0

c  0-1 --> -1
c    (-b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧ -p_984) -> ( b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0)
c  in CNF:
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨  b^{123, 9}_2
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_1
c     b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨  b^{123, 9}_0
c  in DIMACS:
 20144  20145  20146  984  20147 0
 20144  20145  20146  984 -20148 0
 20144  20145  20146  984  20149 0

c  -1-1 --> -2
c    ( b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧  b^{123, 8}_0 ∧ -p_984) -> ( b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0)
c  in CNF:
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨  b^{123, 9}_2
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨  b^{123, 9}_1
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨  p_984 ∨ -b^{123, 9}_0
c  in DIMACS:
-20144  20145 -20146  984  20147 0
-20144  20145 -20146  984  20148 0
-20144  20145 -20146  984 -20149 0

c  -2-1 --> break 
c    ( b^{123, 8}_2 ∧  b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨  b^{123, 8}_0 ∨  p_984 ∨ break
c  in DIMACS:
-20144 -20145  20146  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 8}_2 ∧ -b^{123, 8}_1 ∧ -b^{123, 8}_0 ∧ true) 
c  in CNF:
c    -b^{123, 8}_2 ∨  b^{123, 8}_1 ∨  b^{123, 8}_0 ∨ false 
c  in DIMACS:
-20144  20145  20146  0

c  3 does not represent an automaton state.
c    -(-b^{123, 8}_2 ∧  b^{123, 8}_1 ∧  b^{123, 8}_0 ∧ true) 
c  in CNF:
c     b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ false 
c  in DIMACS:
 20144 -20145 -20146  0
c  -3 does not represent an automaton state.
c    -( b^{123, 8}_2 ∧  b^{123, 8}_1 ∧  b^{123, 8}_0 ∧ true) 
c  in CNF:
c    -b^{123, 8}_2 ∨ -b^{123, 8}_1 ∨ -b^{123, 8}_0 ∨ false 
c  in DIMACS:
-20144 -20145 -20146  0

c i = 9
c  -2+1 --> -1
c    ( b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧  p_1107) -> ( b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧  b^{123, 10}_0)
c  in CNF:
c    -b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨  b^{123, 10}_2
c    -b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_1
c    -b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨  b^{123, 10}_0
c  in DIMACS:
-20147 -20148  20149 -1107  20150 0
-20147 -20148  20149 -1107 -20151 0
-20147 -20148  20149 -1107  20152 0

c  -1+1 --> 0
c    ( b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0 ∧  p_1107) -> (-b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧ -b^{123, 10}_0)
c  in CNF:
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_2
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_1
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_0
c  in DIMACS:
-20147  20148 -20149 -1107 -20150 0
-20147  20148 -20149 -1107 -20151 0
-20147  20148 -20149 -1107 -20152 0

c  0+1 --> 1
c    (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧  p_1107) -> (-b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧  b^{123, 10}_0)
c  in CNF:
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_2
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_1
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨  b^{123, 10}_0
c  in DIMACS:
 20147  20148  20149 -1107 -20150 0
 20147  20148  20149 -1107 -20151 0
 20147  20148  20149 -1107  20152 0

c  1+1 --> 2
c    (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0 ∧  p_1107) -> (-b^{123, 10}_2 ∧  b^{123, 10}_1 ∧ -b^{123, 10}_0)
c  in CNF:
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_2
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨  b^{123, 10}_1
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ -p_1107 ∨ -b^{123, 10}_0
c  in DIMACS:
 20147  20148 -20149 -1107 -20150 0
 20147  20148 -20149 -1107  20151 0
 20147  20148 -20149 -1107 -20152 0

c  2+1 --> break 
c    (-b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 20147 -20148  20149 -1107 1162 0


c  2-1 --> 1
c    (-b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧ -p_1107) -> (-b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧  b^{123, 10}_0)
c  in CNF:
c     b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_2
c     b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_1
c     b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨  b^{123, 10}_0
c  in DIMACS:
 20147 -20148  20149  1107 -20150 0
 20147 -20148  20149  1107 -20151 0
 20147 -20148  20149  1107  20152 0

c  1-1 --> 0
c    (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0 ∧ -p_1107) -> (-b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧ -b^{123, 10}_0)
c  in CNF:
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_2
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_1
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_0
c  in DIMACS:
 20147  20148 -20149  1107 -20150 0
 20147  20148 -20149  1107 -20151 0
 20147  20148 -20149  1107 -20152 0

c  0-1 --> -1
c    (-b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧ -p_1107) -> ( b^{123, 10}_2 ∧ -b^{123, 10}_1 ∧  b^{123, 10}_0)
c  in CNF:
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨  b^{123, 10}_2
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_1
c     b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨  b^{123, 10}_0
c  in DIMACS:
 20147  20148  20149  1107  20150 0
 20147  20148  20149  1107 -20151 0
 20147  20148  20149  1107  20152 0

c  -1-1 --> -2
c    ( b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧  b^{123, 9}_0 ∧ -p_1107) -> ( b^{123, 10}_2 ∧  b^{123, 10}_1 ∧ -b^{123, 10}_0)
c  in CNF:
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨  b^{123, 10}_2
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨  b^{123, 10}_1
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨  p_1107 ∨ -b^{123, 10}_0
c  in DIMACS:
-20147  20148 -20149  1107  20150 0
-20147  20148 -20149  1107  20151 0
-20147  20148 -20149  1107 -20152 0

c  -2-1 --> break 
c    ( b^{123, 9}_2 ∧  b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨  b^{123, 9}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-20147 -20148  20149  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{123, 9}_2 ∧ -b^{123, 9}_1 ∧ -b^{123, 9}_0 ∧ true) 
c  in CNF:
c    -b^{123, 9}_2 ∨  b^{123, 9}_1 ∨  b^{123, 9}_0 ∨ false 
c  in DIMACS:
-20147  20148  20149  0

c  3 does not represent an automaton state.
c    -(-b^{123, 9}_2 ∧  b^{123, 9}_1 ∧  b^{123, 9}_0 ∧ true) 
c  in CNF:
c     b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ false 
c  in DIMACS:
 20147 -20148 -20149  0
c  -3 does not represent an automaton state.
c    -( b^{123, 9}_2 ∧  b^{123, 9}_1 ∧  b^{123, 9}_0 ∧ true) 
c  in CNF:
c    -b^{123, 9}_2 ∨ -b^{123, 9}_1 ∨ -b^{123, 9}_0 ∨ false 
c  in DIMACS:
-20147 -20148 -20149  0

c INIT for k = 124
c    -b^{124, 1}_2
c    -b^{124, 1}_1
c    -b^{124, 1}_0
c  in DIMACS:
-20153 0
-20154 0
-20155 0

c Transitions for k = 124
c i = 1
c  -2+1 --> -1
c    ( b^{124, 1}_2 ∧  b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧  p_124) -> ( b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0)
c  in CNF:
c    -b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨  b^{124, 2}_2
c    -b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_1
c    -b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨  b^{124, 2}_0
c  in DIMACS:
-20153 -20154  20155 -124  20156 0
-20153 -20154  20155 -124 -20157 0
-20153 -20154  20155 -124  20158 0

c  -1+1 --> 0
c    ( b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧  b^{124, 1}_0 ∧  p_124) -> (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧ -b^{124, 2}_0)
c  in CNF:
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_2
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_1
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_0
c  in DIMACS:
-20153  20154 -20155 -124 -20156 0
-20153  20154 -20155 -124 -20157 0
-20153  20154 -20155 -124 -20158 0

c  0+1 --> 1
c    (-b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧  p_124) -> (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0)
c  in CNF:
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_2
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_1
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨  b^{124, 2}_0
c  in DIMACS:
 20153  20154  20155 -124 -20156 0
 20153  20154  20155 -124 -20157 0
 20153  20154  20155 -124  20158 0

c  1+1 --> 2
c    (-b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧  b^{124, 1}_0 ∧  p_124) -> (-b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0)
c  in CNF:
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_2
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨  b^{124, 2}_1
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ -p_124 ∨ -b^{124, 2}_0
c  in DIMACS:
 20153  20154 -20155 -124 -20156 0
 20153  20154 -20155 -124  20157 0
 20153  20154 -20155 -124 -20158 0

c  2+1 --> break 
c    (-b^{124, 1}_2 ∧  b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧  p_124) -> break
c  in CNF:
c     b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ -p_124 ∨ break
c  in DIMACS:
 20153 -20154  20155 -124 1162 0


c  2-1 --> 1
c    (-b^{124, 1}_2 ∧  b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧ -p_124) -> (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0)
c  in CNF:
c     b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_2
c     b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_1
c     b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨  b^{124, 2}_0
c  in DIMACS:
 20153 -20154  20155  124 -20156 0
 20153 -20154  20155  124 -20157 0
 20153 -20154  20155  124  20158 0

c  1-1 --> 0
c    (-b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧  b^{124, 1}_0 ∧ -p_124) -> (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧ -b^{124, 2}_0)
c  in CNF:
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_2
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_1
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_0
c  in DIMACS:
 20153  20154 -20155  124 -20156 0
 20153  20154 -20155  124 -20157 0
 20153  20154 -20155  124 -20158 0

c  0-1 --> -1
c    (-b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧ -p_124) -> ( b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0)
c  in CNF:
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨  b^{124, 2}_2
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_1
c     b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨  b^{124, 2}_0
c  in DIMACS:
 20153  20154  20155  124  20156 0
 20153  20154  20155  124 -20157 0
 20153  20154  20155  124  20158 0

c  -1-1 --> -2
c    ( b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧  b^{124, 1}_0 ∧ -p_124) -> ( b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0)
c  in CNF:
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨  b^{124, 2}_2
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨  b^{124, 2}_1
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨  p_124 ∨ -b^{124, 2}_0
c  in DIMACS:
-20153  20154 -20155  124  20156 0
-20153  20154 -20155  124  20157 0
-20153  20154 -20155  124 -20158 0

c  -2-1 --> break 
c    ( b^{124, 1}_2 ∧  b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧ -p_124) -> break
c  in CNF:
c    -b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨  b^{124, 1}_0 ∨  p_124 ∨ break
c  in DIMACS:
-20153 -20154  20155  124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 1}_2 ∧ -b^{124, 1}_1 ∧ -b^{124, 1}_0 ∧ true) 
c  in CNF:
c    -b^{124, 1}_2 ∨  b^{124, 1}_1 ∨  b^{124, 1}_0 ∨ false 
c  in DIMACS:
-20153  20154  20155  0

c  3 does not represent an automaton state.
c    -(-b^{124, 1}_2 ∧  b^{124, 1}_1 ∧  b^{124, 1}_0 ∧ true) 
c  in CNF:
c     b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ false 
c  in DIMACS:
 20153 -20154 -20155  0
c  -3 does not represent an automaton state.
c    -( b^{124, 1}_2 ∧  b^{124, 1}_1 ∧  b^{124, 1}_0 ∧ true) 
c  in CNF:
c    -b^{124, 1}_2 ∨ -b^{124, 1}_1 ∨ -b^{124, 1}_0 ∨ false 
c  in DIMACS:
-20153 -20154 -20155  0

c i = 2
c  -2+1 --> -1
c    ( b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧  p_248) -> ( b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0)
c  in CNF:
c    -b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨  b^{124, 3}_2
c    -b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_1
c    -b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨  b^{124, 3}_0
c  in DIMACS:
-20156 -20157  20158 -248  20159 0
-20156 -20157  20158 -248 -20160 0
-20156 -20157  20158 -248  20161 0

c  -1+1 --> 0
c    ( b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0 ∧  p_248) -> (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧ -b^{124, 3}_0)
c  in CNF:
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_2
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_1
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_0
c  in DIMACS:
-20156  20157 -20158 -248 -20159 0
-20156  20157 -20158 -248 -20160 0
-20156  20157 -20158 -248 -20161 0

c  0+1 --> 1
c    (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧  p_248) -> (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0)
c  in CNF:
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_2
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_1
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨  b^{124, 3}_0
c  in DIMACS:
 20156  20157  20158 -248 -20159 0
 20156  20157  20158 -248 -20160 0
 20156  20157  20158 -248  20161 0

c  1+1 --> 2
c    (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0 ∧  p_248) -> (-b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0)
c  in CNF:
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_2
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨  b^{124, 3}_1
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ -p_248 ∨ -b^{124, 3}_0
c  in DIMACS:
 20156  20157 -20158 -248 -20159 0
 20156  20157 -20158 -248  20160 0
 20156  20157 -20158 -248 -20161 0

c  2+1 --> break 
c    (-b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧  p_248) -> break
c  in CNF:
c     b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 20156 -20157  20158 -248 1162 0


c  2-1 --> 1
c    (-b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧ -p_248) -> (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0)
c  in CNF:
c     b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_2
c     b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_1
c     b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨  b^{124, 3}_0
c  in DIMACS:
 20156 -20157  20158  248 -20159 0
 20156 -20157  20158  248 -20160 0
 20156 -20157  20158  248  20161 0

c  1-1 --> 0
c    (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0 ∧ -p_248) -> (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧ -b^{124, 3}_0)
c  in CNF:
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_2
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_1
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_0
c  in DIMACS:
 20156  20157 -20158  248 -20159 0
 20156  20157 -20158  248 -20160 0
 20156  20157 -20158  248 -20161 0

c  0-1 --> -1
c    (-b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧ -p_248) -> ( b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0)
c  in CNF:
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨  b^{124, 3}_2
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_1
c     b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨  b^{124, 3}_0
c  in DIMACS:
 20156  20157  20158  248  20159 0
 20156  20157  20158  248 -20160 0
 20156  20157  20158  248  20161 0

c  -1-1 --> -2
c    ( b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧  b^{124, 2}_0 ∧ -p_248) -> ( b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0)
c  in CNF:
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨  b^{124, 3}_2
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨  b^{124, 3}_1
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨  p_248 ∨ -b^{124, 3}_0
c  in DIMACS:
-20156  20157 -20158  248  20159 0
-20156  20157 -20158  248  20160 0
-20156  20157 -20158  248 -20161 0

c  -2-1 --> break 
c    ( b^{124, 2}_2 ∧  b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨  b^{124, 2}_0 ∨  p_248 ∨ break
c  in DIMACS:
-20156 -20157  20158  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 2}_2 ∧ -b^{124, 2}_1 ∧ -b^{124, 2}_0 ∧ true) 
c  in CNF:
c    -b^{124, 2}_2 ∨  b^{124, 2}_1 ∨  b^{124, 2}_0 ∨ false 
c  in DIMACS:
-20156  20157  20158  0

c  3 does not represent an automaton state.
c    -(-b^{124, 2}_2 ∧  b^{124, 2}_1 ∧  b^{124, 2}_0 ∧ true) 
c  in CNF:
c     b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ false 
c  in DIMACS:
 20156 -20157 -20158  0
c  -3 does not represent an automaton state.
c    -( b^{124, 2}_2 ∧  b^{124, 2}_1 ∧  b^{124, 2}_0 ∧ true) 
c  in CNF:
c    -b^{124, 2}_2 ∨ -b^{124, 2}_1 ∨ -b^{124, 2}_0 ∨ false 
c  in DIMACS:
-20156 -20157 -20158  0

c i = 3
c  -2+1 --> -1
c    ( b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧  p_372) -> ( b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0)
c  in CNF:
c    -b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨  b^{124, 4}_2
c    -b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_1
c    -b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨  b^{124, 4}_0
c  in DIMACS:
-20159 -20160  20161 -372  20162 0
-20159 -20160  20161 -372 -20163 0
-20159 -20160  20161 -372  20164 0

c  -1+1 --> 0
c    ( b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0 ∧  p_372) -> (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧ -b^{124, 4}_0)
c  in CNF:
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_2
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_1
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_0
c  in DIMACS:
-20159  20160 -20161 -372 -20162 0
-20159  20160 -20161 -372 -20163 0
-20159  20160 -20161 -372 -20164 0

c  0+1 --> 1
c    (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧  p_372) -> (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0)
c  in CNF:
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_2
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_1
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨  b^{124, 4}_0
c  in DIMACS:
 20159  20160  20161 -372 -20162 0
 20159  20160  20161 -372 -20163 0
 20159  20160  20161 -372  20164 0

c  1+1 --> 2
c    (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0 ∧  p_372) -> (-b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0)
c  in CNF:
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_2
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨  b^{124, 4}_1
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ -p_372 ∨ -b^{124, 4}_0
c  in DIMACS:
 20159  20160 -20161 -372 -20162 0
 20159  20160 -20161 -372  20163 0
 20159  20160 -20161 -372 -20164 0

c  2+1 --> break 
c    (-b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧  p_372) -> break
c  in CNF:
c     b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 20159 -20160  20161 -372 1162 0


c  2-1 --> 1
c    (-b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧ -p_372) -> (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0)
c  in CNF:
c     b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_2
c     b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_1
c     b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨  b^{124, 4}_0
c  in DIMACS:
 20159 -20160  20161  372 -20162 0
 20159 -20160  20161  372 -20163 0
 20159 -20160  20161  372  20164 0

c  1-1 --> 0
c    (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0 ∧ -p_372) -> (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧ -b^{124, 4}_0)
c  in CNF:
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_2
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_1
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_0
c  in DIMACS:
 20159  20160 -20161  372 -20162 0
 20159  20160 -20161  372 -20163 0
 20159  20160 -20161  372 -20164 0

c  0-1 --> -1
c    (-b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧ -p_372) -> ( b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0)
c  in CNF:
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨  b^{124, 4}_2
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_1
c     b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨  b^{124, 4}_0
c  in DIMACS:
 20159  20160  20161  372  20162 0
 20159  20160  20161  372 -20163 0
 20159  20160  20161  372  20164 0

c  -1-1 --> -2
c    ( b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧  b^{124, 3}_0 ∧ -p_372) -> ( b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0)
c  in CNF:
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨  b^{124, 4}_2
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨  b^{124, 4}_1
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨  p_372 ∨ -b^{124, 4}_0
c  in DIMACS:
-20159  20160 -20161  372  20162 0
-20159  20160 -20161  372  20163 0
-20159  20160 -20161  372 -20164 0

c  -2-1 --> break 
c    ( b^{124, 3}_2 ∧  b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨  b^{124, 3}_0 ∨  p_372 ∨ break
c  in DIMACS:
-20159 -20160  20161  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 3}_2 ∧ -b^{124, 3}_1 ∧ -b^{124, 3}_0 ∧ true) 
c  in CNF:
c    -b^{124, 3}_2 ∨  b^{124, 3}_1 ∨  b^{124, 3}_0 ∨ false 
c  in DIMACS:
-20159  20160  20161  0

c  3 does not represent an automaton state.
c    -(-b^{124, 3}_2 ∧  b^{124, 3}_1 ∧  b^{124, 3}_0 ∧ true) 
c  in CNF:
c     b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ false 
c  in DIMACS:
 20159 -20160 -20161  0
c  -3 does not represent an automaton state.
c    -( b^{124, 3}_2 ∧  b^{124, 3}_1 ∧  b^{124, 3}_0 ∧ true) 
c  in CNF:
c    -b^{124, 3}_2 ∨ -b^{124, 3}_1 ∨ -b^{124, 3}_0 ∨ false 
c  in DIMACS:
-20159 -20160 -20161  0

c i = 4
c  -2+1 --> -1
c    ( b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧  p_496) -> ( b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0)
c  in CNF:
c    -b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨  b^{124, 5}_2
c    -b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_1
c    -b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨  b^{124, 5}_0
c  in DIMACS:
-20162 -20163  20164 -496  20165 0
-20162 -20163  20164 -496 -20166 0
-20162 -20163  20164 -496  20167 0

c  -1+1 --> 0
c    ( b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0 ∧  p_496) -> (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧ -b^{124, 5}_0)
c  in CNF:
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_2
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_1
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_0
c  in DIMACS:
-20162  20163 -20164 -496 -20165 0
-20162  20163 -20164 -496 -20166 0
-20162  20163 -20164 -496 -20167 0

c  0+1 --> 1
c    (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧  p_496) -> (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0)
c  in CNF:
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_2
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_1
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨  b^{124, 5}_0
c  in DIMACS:
 20162  20163  20164 -496 -20165 0
 20162  20163  20164 -496 -20166 0
 20162  20163  20164 -496  20167 0

c  1+1 --> 2
c    (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0 ∧  p_496) -> (-b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0)
c  in CNF:
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_2
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨  b^{124, 5}_1
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ -p_496 ∨ -b^{124, 5}_0
c  in DIMACS:
 20162  20163 -20164 -496 -20165 0
 20162  20163 -20164 -496  20166 0
 20162  20163 -20164 -496 -20167 0

c  2+1 --> break 
c    (-b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧  p_496) -> break
c  in CNF:
c     b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 20162 -20163  20164 -496 1162 0


c  2-1 --> 1
c    (-b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧ -p_496) -> (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0)
c  in CNF:
c     b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_2
c     b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_1
c     b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨  b^{124, 5}_0
c  in DIMACS:
 20162 -20163  20164  496 -20165 0
 20162 -20163  20164  496 -20166 0
 20162 -20163  20164  496  20167 0

c  1-1 --> 0
c    (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0 ∧ -p_496) -> (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧ -b^{124, 5}_0)
c  in CNF:
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_2
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_1
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_0
c  in DIMACS:
 20162  20163 -20164  496 -20165 0
 20162  20163 -20164  496 -20166 0
 20162  20163 -20164  496 -20167 0

c  0-1 --> -1
c    (-b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧ -p_496) -> ( b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0)
c  in CNF:
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨  b^{124, 5}_2
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_1
c     b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨  b^{124, 5}_0
c  in DIMACS:
 20162  20163  20164  496  20165 0
 20162  20163  20164  496 -20166 0
 20162  20163  20164  496  20167 0

c  -1-1 --> -2
c    ( b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧  b^{124, 4}_0 ∧ -p_496) -> ( b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0)
c  in CNF:
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨  b^{124, 5}_2
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨  b^{124, 5}_1
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨  p_496 ∨ -b^{124, 5}_0
c  in DIMACS:
-20162  20163 -20164  496  20165 0
-20162  20163 -20164  496  20166 0
-20162  20163 -20164  496 -20167 0

c  -2-1 --> break 
c    ( b^{124, 4}_2 ∧  b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨  b^{124, 4}_0 ∨  p_496 ∨ break
c  in DIMACS:
-20162 -20163  20164  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 4}_2 ∧ -b^{124, 4}_1 ∧ -b^{124, 4}_0 ∧ true) 
c  in CNF:
c    -b^{124, 4}_2 ∨  b^{124, 4}_1 ∨  b^{124, 4}_0 ∨ false 
c  in DIMACS:
-20162  20163  20164  0

c  3 does not represent an automaton state.
c    -(-b^{124, 4}_2 ∧  b^{124, 4}_1 ∧  b^{124, 4}_0 ∧ true) 
c  in CNF:
c     b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ false 
c  in DIMACS:
 20162 -20163 -20164  0
c  -3 does not represent an automaton state.
c    -( b^{124, 4}_2 ∧  b^{124, 4}_1 ∧  b^{124, 4}_0 ∧ true) 
c  in CNF:
c    -b^{124, 4}_2 ∨ -b^{124, 4}_1 ∨ -b^{124, 4}_0 ∨ false 
c  in DIMACS:
-20162 -20163 -20164  0

c i = 5
c  -2+1 --> -1
c    ( b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧  p_620) -> ( b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0)
c  in CNF:
c    -b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨  b^{124, 6}_2
c    -b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_1
c    -b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨  b^{124, 6}_0
c  in DIMACS:
-20165 -20166  20167 -620  20168 0
-20165 -20166  20167 -620 -20169 0
-20165 -20166  20167 -620  20170 0

c  -1+1 --> 0
c    ( b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0 ∧  p_620) -> (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧ -b^{124, 6}_0)
c  in CNF:
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_2
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_1
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_0
c  in DIMACS:
-20165  20166 -20167 -620 -20168 0
-20165  20166 -20167 -620 -20169 0
-20165  20166 -20167 -620 -20170 0

c  0+1 --> 1
c    (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧  p_620) -> (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0)
c  in CNF:
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_2
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_1
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨  b^{124, 6}_0
c  in DIMACS:
 20165  20166  20167 -620 -20168 0
 20165  20166  20167 -620 -20169 0
 20165  20166  20167 -620  20170 0

c  1+1 --> 2
c    (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0 ∧  p_620) -> (-b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0)
c  in CNF:
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_2
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨  b^{124, 6}_1
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ -p_620 ∨ -b^{124, 6}_0
c  in DIMACS:
 20165  20166 -20167 -620 -20168 0
 20165  20166 -20167 -620  20169 0
 20165  20166 -20167 -620 -20170 0

c  2+1 --> break 
c    (-b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧  p_620) -> break
c  in CNF:
c     b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 20165 -20166  20167 -620 1162 0


c  2-1 --> 1
c    (-b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧ -p_620) -> (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0)
c  in CNF:
c     b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_2
c     b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_1
c     b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨  b^{124, 6}_0
c  in DIMACS:
 20165 -20166  20167  620 -20168 0
 20165 -20166  20167  620 -20169 0
 20165 -20166  20167  620  20170 0

c  1-1 --> 0
c    (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0 ∧ -p_620) -> (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧ -b^{124, 6}_0)
c  in CNF:
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_2
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_1
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_0
c  in DIMACS:
 20165  20166 -20167  620 -20168 0
 20165  20166 -20167  620 -20169 0
 20165  20166 -20167  620 -20170 0

c  0-1 --> -1
c    (-b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧ -p_620) -> ( b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0)
c  in CNF:
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨  b^{124, 6}_2
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_1
c     b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨  b^{124, 6}_0
c  in DIMACS:
 20165  20166  20167  620  20168 0
 20165  20166  20167  620 -20169 0
 20165  20166  20167  620  20170 0

c  -1-1 --> -2
c    ( b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧  b^{124, 5}_0 ∧ -p_620) -> ( b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0)
c  in CNF:
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨  b^{124, 6}_2
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨  b^{124, 6}_1
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨  p_620 ∨ -b^{124, 6}_0
c  in DIMACS:
-20165  20166 -20167  620  20168 0
-20165  20166 -20167  620  20169 0
-20165  20166 -20167  620 -20170 0

c  -2-1 --> break 
c    ( b^{124, 5}_2 ∧  b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨  b^{124, 5}_0 ∨  p_620 ∨ break
c  in DIMACS:
-20165 -20166  20167  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 5}_2 ∧ -b^{124, 5}_1 ∧ -b^{124, 5}_0 ∧ true) 
c  in CNF:
c    -b^{124, 5}_2 ∨  b^{124, 5}_1 ∨  b^{124, 5}_0 ∨ false 
c  in DIMACS:
-20165  20166  20167  0

c  3 does not represent an automaton state.
c    -(-b^{124, 5}_2 ∧  b^{124, 5}_1 ∧  b^{124, 5}_0 ∧ true) 
c  in CNF:
c     b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ false 
c  in DIMACS:
 20165 -20166 -20167  0
c  -3 does not represent an automaton state.
c    -( b^{124, 5}_2 ∧  b^{124, 5}_1 ∧  b^{124, 5}_0 ∧ true) 
c  in CNF:
c    -b^{124, 5}_2 ∨ -b^{124, 5}_1 ∨ -b^{124, 5}_0 ∨ false 
c  in DIMACS:
-20165 -20166 -20167  0

c i = 6
c  -2+1 --> -1
c    ( b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧  p_744) -> ( b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0)
c  in CNF:
c    -b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨  b^{124, 7}_2
c    -b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_1
c    -b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨  b^{124, 7}_0
c  in DIMACS:
-20168 -20169  20170 -744  20171 0
-20168 -20169  20170 -744 -20172 0
-20168 -20169  20170 -744  20173 0

c  -1+1 --> 0
c    ( b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0 ∧  p_744) -> (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧ -b^{124, 7}_0)
c  in CNF:
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_2
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_1
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_0
c  in DIMACS:
-20168  20169 -20170 -744 -20171 0
-20168  20169 -20170 -744 -20172 0
-20168  20169 -20170 -744 -20173 0

c  0+1 --> 1
c    (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧  p_744) -> (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0)
c  in CNF:
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_2
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_1
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨  b^{124, 7}_0
c  in DIMACS:
 20168  20169  20170 -744 -20171 0
 20168  20169  20170 -744 -20172 0
 20168  20169  20170 -744  20173 0

c  1+1 --> 2
c    (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0 ∧  p_744) -> (-b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0)
c  in CNF:
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_2
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨  b^{124, 7}_1
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ -p_744 ∨ -b^{124, 7}_0
c  in DIMACS:
 20168  20169 -20170 -744 -20171 0
 20168  20169 -20170 -744  20172 0
 20168  20169 -20170 -744 -20173 0

c  2+1 --> break 
c    (-b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧  p_744) -> break
c  in CNF:
c     b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 20168 -20169  20170 -744 1162 0


c  2-1 --> 1
c    (-b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧ -p_744) -> (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0)
c  in CNF:
c     b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_2
c     b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_1
c     b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨  b^{124, 7}_0
c  in DIMACS:
 20168 -20169  20170  744 -20171 0
 20168 -20169  20170  744 -20172 0
 20168 -20169  20170  744  20173 0

c  1-1 --> 0
c    (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0 ∧ -p_744) -> (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧ -b^{124, 7}_0)
c  in CNF:
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_2
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_1
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_0
c  in DIMACS:
 20168  20169 -20170  744 -20171 0
 20168  20169 -20170  744 -20172 0
 20168  20169 -20170  744 -20173 0

c  0-1 --> -1
c    (-b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧ -p_744) -> ( b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0)
c  in CNF:
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨  b^{124, 7}_2
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_1
c     b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨  b^{124, 7}_0
c  in DIMACS:
 20168  20169  20170  744  20171 0
 20168  20169  20170  744 -20172 0
 20168  20169  20170  744  20173 0

c  -1-1 --> -2
c    ( b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧  b^{124, 6}_0 ∧ -p_744) -> ( b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0)
c  in CNF:
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨  b^{124, 7}_2
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨  b^{124, 7}_1
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨  p_744 ∨ -b^{124, 7}_0
c  in DIMACS:
-20168  20169 -20170  744  20171 0
-20168  20169 -20170  744  20172 0
-20168  20169 -20170  744 -20173 0

c  -2-1 --> break 
c    ( b^{124, 6}_2 ∧  b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨  b^{124, 6}_0 ∨  p_744 ∨ break
c  in DIMACS:
-20168 -20169  20170  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 6}_2 ∧ -b^{124, 6}_1 ∧ -b^{124, 6}_0 ∧ true) 
c  in CNF:
c    -b^{124, 6}_2 ∨  b^{124, 6}_1 ∨  b^{124, 6}_0 ∨ false 
c  in DIMACS:
-20168  20169  20170  0

c  3 does not represent an automaton state.
c    -(-b^{124, 6}_2 ∧  b^{124, 6}_1 ∧  b^{124, 6}_0 ∧ true) 
c  in CNF:
c     b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ false 
c  in DIMACS:
 20168 -20169 -20170  0
c  -3 does not represent an automaton state.
c    -( b^{124, 6}_2 ∧  b^{124, 6}_1 ∧  b^{124, 6}_0 ∧ true) 
c  in CNF:
c    -b^{124, 6}_2 ∨ -b^{124, 6}_1 ∨ -b^{124, 6}_0 ∨ false 
c  in DIMACS:
-20168 -20169 -20170  0

c i = 7
c  -2+1 --> -1
c    ( b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧  p_868) -> ( b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0)
c  in CNF:
c    -b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨  b^{124, 8}_2
c    -b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_1
c    -b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨  b^{124, 8}_0
c  in DIMACS:
-20171 -20172  20173 -868  20174 0
-20171 -20172  20173 -868 -20175 0
-20171 -20172  20173 -868  20176 0

c  -1+1 --> 0
c    ( b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0 ∧  p_868) -> (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧ -b^{124, 8}_0)
c  in CNF:
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_2
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_1
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_0
c  in DIMACS:
-20171  20172 -20173 -868 -20174 0
-20171  20172 -20173 -868 -20175 0
-20171  20172 -20173 -868 -20176 0

c  0+1 --> 1
c    (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧  p_868) -> (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0)
c  in CNF:
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_2
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_1
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨  b^{124, 8}_0
c  in DIMACS:
 20171  20172  20173 -868 -20174 0
 20171  20172  20173 -868 -20175 0
 20171  20172  20173 -868  20176 0

c  1+1 --> 2
c    (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0 ∧  p_868) -> (-b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0)
c  in CNF:
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_2
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨  b^{124, 8}_1
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ -p_868 ∨ -b^{124, 8}_0
c  in DIMACS:
 20171  20172 -20173 -868 -20174 0
 20171  20172 -20173 -868  20175 0
 20171  20172 -20173 -868 -20176 0

c  2+1 --> break 
c    (-b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧  p_868) -> break
c  in CNF:
c     b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 20171 -20172  20173 -868 1162 0


c  2-1 --> 1
c    (-b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧ -p_868) -> (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0)
c  in CNF:
c     b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_2
c     b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_1
c     b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨  b^{124, 8}_0
c  in DIMACS:
 20171 -20172  20173  868 -20174 0
 20171 -20172  20173  868 -20175 0
 20171 -20172  20173  868  20176 0

c  1-1 --> 0
c    (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0 ∧ -p_868) -> (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧ -b^{124, 8}_0)
c  in CNF:
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_2
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_1
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_0
c  in DIMACS:
 20171  20172 -20173  868 -20174 0
 20171  20172 -20173  868 -20175 0
 20171  20172 -20173  868 -20176 0

c  0-1 --> -1
c    (-b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧ -p_868) -> ( b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0)
c  in CNF:
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨  b^{124, 8}_2
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_1
c     b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨  b^{124, 8}_0
c  in DIMACS:
 20171  20172  20173  868  20174 0
 20171  20172  20173  868 -20175 0
 20171  20172  20173  868  20176 0

c  -1-1 --> -2
c    ( b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧  b^{124, 7}_0 ∧ -p_868) -> ( b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0)
c  in CNF:
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨  b^{124, 8}_2
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨  b^{124, 8}_1
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨  p_868 ∨ -b^{124, 8}_0
c  in DIMACS:
-20171  20172 -20173  868  20174 0
-20171  20172 -20173  868  20175 0
-20171  20172 -20173  868 -20176 0

c  -2-1 --> break 
c    ( b^{124, 7}_2 ∧  b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨  b^{124, 7}_0 ∨  p_868 ∨ break
c  in DIMACS:
-20171 -20172  20173  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 7}_2 ∧ -b^{124, 7}_1 ∧ -b^{124, 7}_0 ∧ true) 
c  in CNF:
c    -b^{124, 7}_2 ∨  b^{124, 7}_1 ∨  b^{124, 7}_0 ∨ false 
c  in DIMACS:
-20171  20172  20173  0

c  3 does not represent an automaton state.
c    -(-b^{124, 7}_2 ∧  b^{124, 7}_1 ∧  b^{124, 7}_0 ∧ true) 
c  in CNF:
c     b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ false 
c  in DIMACS:
 20171 -20172 -20173  0
c  -3 does not represent an automaton state.
c    -( b^{124, 7}_2 ∧  b^{124, 7}_1 ∧  b^{124, 7}_0 ∧ true) 
c  in CNF:
c    -b^{124, 7}_2 ∨ -b^{124, 7}_1 ∨ -b^{124, 7}_0 ∨ false 
c  in DIMACS:
-20171 -20172 -20173  0

c i = 8
c  -2+1 --> -1
c    ( b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧  p_992) -> ( b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0)
c  in CNF:
c    -b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨  b^{124, 9}_2
c    -b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_1
c    -b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨  b^{124, 9}_0
c  in DIMACS:
-20174 -20175  20176 -992  20177 0
-20174 -20175  20176 -992 -20178 0
-20174 -20175  20176 -992  20179 0

c  -1+1 --> 0
c    ( b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0 ∧  p_992) -> (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧ -b^{124, 9}_0)
c  in CNF:
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_2
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_1
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_0
c  in DIMACS:
-20174  20175 -20176 -992 -20177 0
-20174  20175 -20176 -992 -20178 0
-20174  20175 -20176 -992 -20179 0

c  0+1 --> 1
c    (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧  p_992) -> (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0)
c  in CNF:
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_2
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_1
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨  b^{124, 9}_0
c  in DIMACS:
 20174  20175  20176 -992 -20177 0
 20174  20175  20176 -992 -20178 0
 20174  20175  20176 -992  20179 0

c  1+1 --> 2
c    (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0 ∧  p_992) -> (-b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0)
c  in CNF:
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_2
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨  b^{124, 9}_1
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ -p_992 ∨ -b^{124, 9}_0
c  in DIMACS:
 20174  20175 -20176 -992 -20177 0
 20174  20175 -20176 -992  20178 0
 20174  20175 -20176 -992 -20179 0

c  2+1 --> break 
c    (-b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧  p_992) -> break
c  in CNF:
c     b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 20174 -20175  20176 -992 1162 0


c  2-1 --> 1
c    (-b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧ -p_992) -> (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0)
c  in CNF:
c     b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_2
c     b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_1
c     b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨  b^{124, 9}_0
c  in DIMACS:
 20174 -20175  20176  992 -20177 0
 20174 -20175  20176  992 -20178 0
 20174 -20175  20176  992  20179 0

c  1-1 --> 0
c    (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0 ∧ -p_992) -> (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧ -b^{124, 9}_0)
c  in CNF:
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_2
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_1
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_0
c  in DIMACS:
 20174  20175 -20176  992 -20177 0
 20174  20175 -20176  992 -20178 0
 20174  20175 -20176  992 -20179 0

c  0-1 --> -1
c    (-b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧ -p_992) -> ( b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0)
c  in CNF:
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨  b^{124, 9}_2
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_1
c     b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨  b^{124, 9}_0
c  in DIMACS:
 20174  20175  20176  992  20177 0
 20174  20175  20176  992 -20178 0
 20174  20175  20176  992  20179 0

c  -1-1 --> -2
c    ( b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧  b^{124, 8}_0 ∧ -p_992) -> ( b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0)
c  in CNF:
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨  b^{124, 9}_2
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨  b^{124, 9}_1
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨  p_992 ∨ -b^{124, 9}_0
c  in DIMACS:
-20174  20175 -20176  992  20177 0
-20174  20175 -20176  992  20178 0
-20174  20175 -20176  992 -20179 0

c  -2-1 --> break 
c    ( b^{124, 8}_2 ∧  b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨  b^{124, 8}_0 ∨  p_992 ∨ break
c  in DIMACS:
-20174 -20175  20176  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 8}_2 ∧ -b^{124, 8}_1 ∧ -b^{124, 8}_0 ∧ true) 
c  in CNF:
c    -b^{124, 8}_2 ∨  b^{124, 8}_1 ∨  b^{124, 8}_0 ∨ false 
c  in DIMACS:
-20174  20175  20176  0

c  3 does not represent an automaton state.
c    -(-b^{124, 8}_2 ∧  b^{124, 8}_1 ∧  b^{124, 8}_0 ∧ true) 
c  in CNF:
c     b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ false 
c  in DIMACS:
 20174 -20175 -20176  0
c  -3 does not represent an automaton state.
c    -( b^{124, 8}_2 ∧  b^{124, 8}_1 ∧  b^{124, 8}_0 ∧ true) 
c  in CNF:
c    -b^{124, 8}_2 ∨ -b^{124, 8}_1 ∨ -b^{124, 8}_0 ∨ false 
c  in DIMACS:
-20174 -20175 -20176  0

c i = 9
c  -2+1 --> -1
c    ( b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧  p_1116) -> ( b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧  b^{124, 10}_0)
c  in CNF:
c    -b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨  b^{124, 10}_2
c    -b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_1
c    -b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨  b^{124, 10}_0
c  in DIMACS:
-20177 -20178  20179 -1116  20180 0
-20177 -20178  20179 -1116 -20181 0
-20177 -20178  20179 -1116  20182 0

c  -1+1 --> 0
c    ( b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0 ∧  p_1116) -> (-b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧ -b^{124, 10}_0)
c  in CNF:
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_2
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_1
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_0
c  in DIMACS:
-20177  20178 -20179 -1116 -20180 0
-20177  20178 -20179 -1116 -20181 0
-20177  20178 -20179 -1116 -20182 0

c  0+1 --> 1
c    (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧  p_1116) -> (-b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧  b^{124, 10}_0)
c  in CNF:
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_2
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_1
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨  b^{124, 10}_0
c  in DIMACS:
 20177  20178  20179 -1116 -20180 0
 20177  20178  20179 -1116 -20181 0
 20177  20178  20179 -1116  20182 0

c  1+1 --> 2
c    (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0 ∧  p_1116) -> (-b^{124, 10}_2 ∧  b^{124, 10}_1 ∧ -b^{124, 10}_0)
c  in CNF:
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_2
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨  b^{124, 10}_1
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ -p_1116 ∨ -b^{124, 10}_0
c  in DIMACS:
 20177  20178 -20179 -1116 -20180 0
 20177  20178 -20179 -1116  20181 0
 20177  20178 -20179 -1116 -20182 0

c  2+1 --> break 
c    (-b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 20177 -20178  20179 -1116 1162 0


c  2-1 --> 1
c    (-b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧ -p_1116) -> (-b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧  b^{124, 10}_0)
c  in CNF:
c     b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_2
c     b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_1
c     b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨  b^{124, 10}_0
c  in DIMACS:
 20177 -20178  20179  1116 -20180 0
 20177 -20178  20179  1116 -20181 0
 20177 -20178  20179  1116  20182 0

c  1-1 --> 0
c    (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0 ∧ -p_1116) -> (-b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧ -b^{124, 10}_0)
c  in CNF:
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_2
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_1
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_0
c  in DIMACS:
 20177  20178 -20179  1116 -20180 0
 20177  20178 -20179  1116 -20181 0
 20177  20178 -20179  1116 -20182 0

c  0-1 --> -1
c    (-b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧ -p_1116) -> ( b^{124, 10}_2 ∧ -b^{124, 10}_1 ∧  b^{124, 10}_0)
c  in CNF:
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨  b^{124, 10}_2
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_1
c     b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨  b^{124, 10}_0
c  in DIMACS:
 20177  20178  20179  1116  20180 0
 20177  20178  20179  1116 -20181 0
 20177  20178  20179  1116  20182 0

c  -1-1 --> -2
c    ( b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧  b^{124, 9}_0 ∧ -p_1116) -> ( b^{124, 10}_2 ∧  b^{124, 10}_1 ∧ -b^{124, 10}_0)
c  in CNF:
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨  b^{124, 10}_2
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨  b^{124, 10}_1
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨  p_1116 ∨ -b^{124, 10}_0
c  in DIMACS:
-20177  20178 -20179  1116  20180 0
-20177  20178 -20179  1116  20181 0
-20177  20178 -20179  1116 -20182 0

c  -2-1 --> break 
c    ( b^{124, 9}_2 ∧  b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨  b^{124, 9}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-20177 -20178  20179  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{124, 9}_2 ∧ -b^{124, 9}_1 ∧ -b^{124, 9}_0 ∧ true) 
c  in CNF:
c    -b^{124, 9}_2 ∨  b^{124, 9}_1 ∨  b^{124, 9}_0 ∨ false 
c  in DIMACS:
-20177  20178  20179  0

c  3 does not represent an automaton state.
c    -(-b^{124, 9}_2 ∧  b^{124, 9}_1 ∧  b^{124, 9}_0 ∧ true) 
c  in CNF:
c     b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ false 
c  in DIMACS:
 20177 -20178 -20179  0
c  -3 does not represent an automaton state.
c    -( b^{124, 9}_2 ∧  b^{124, 9}_1 ∧  b^{124, 9}_0 ∧ true) 
c  in CNF:
c    -b^{124, 9}_2 ∨ -b^{124, 9}_1 ∨ -b^{124, 9}_0 ∨ false 
c  in DIMACS:
-20177 -20178 -20179  0

c INIT for k = 125
c    -b^{125, 1}_2
c    -b^{125, 1}_1
c    -b^{125, 1}_0
c  in DIMACS:
-20183 0
-20184 0
-20185 0

c Transitions for k = 125
c i = 1
c  -2+1 --> -1
c    ( b^{125, 1}_2 ∧  b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧  p_125) -> ( b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0)
c  in CNF:
c    -b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨  b^{125, 2}_2
c    -b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_1
c    -b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨  b^{125, 2}_0
c  in DIMACS:
-20183 -20184  20185 -125  20186 0
-20183 -20184  20185 -125 -20187 0
-20183 -20184  20185 -125  20188 0

c  -1+1 --> 0
c    ( b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧  b^{125, 1}_0 ∧  p_125) -> (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧ -b^{125, 2}_0)
c  in CNF:
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_2
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_1
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_0
c  in DIMACS:
-20183  20184 -20185 -125 -20186 0
-20183  20184 -20185 -125 -20187 0
-20183  20184 -20185 -125 -20188 0

c  0+1 --> 1
c    (-b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧  p_125) -> (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0)
c  in CNF:
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_2
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_1
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨  b^{125, 2}_0
c  in DIMACS:
 20183  20184  20185 -125 -20186 0
 20183  20184  20185 -125 -20187 0
 20183  20184  20185 -125  20188 0

c  1+1 --> 2
c    (-b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧  b^{125, 1}_0 ∧  p_125) -> (-b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0)
c  in CNF:
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_2
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨  b^{125, 2}_1
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ -p_125 ∨ -b^{125, 2}_0
c  in DIMACS:
 20183  20184 -20185 -125 -20186 0
 20183  20184 -20185 -125  20187 0
 20183  20184 -20185 -125 -20188 0

c  2+1 --> break 
c    (-b^{125, 1}_2 ∧  b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧  p_125) -> break
c  in CNF:
c     b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ -p_125 ∨ break
c  in DIMACS:
 20183 -20184  20185 -125 1162 0


c  2-1 --> 1
c    (-b^{125, 1}_2 ∧  b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧ -p_125) -> (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0)
c  in CNF:
c     b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_2
c     b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_1
c     b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨  b^{125, 2}_0
c  in DIMACS:
 20183 -20184  20185  125 -20186 0
 20183 -20184  20185  125 -20187 0
 20183 -20184  20185  125  20188 0

c  1-1 --> 0
c    (-b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧  b^{125, 1}_0 ∧ -p_125) -> (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧ -b^{125, 2}_0)
c  in CNF:
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_2
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_1
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_0
c  in DIMACS:
 20183  20184 -20185  125 -20186 0
 20183  20184 -20185  125 -20187 0
 20183  20184 -20185  125 -20188 0

c  0-1 --> -1
c    (-b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧ -p_125) -> ( b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0)
c  in CNF:
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨  b^{125, 2}_2
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_1
c     b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨  b^{125, 2}_0
c  in DIMACS:
 20183  20184  20185  125  20186 0
 20183  20184  20185  125 -20187 0
 20183  20184  20185  125  20188 0

c  -1-1 --> -2
c    ( b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧  b^{125, 1}_0 ∧ -p_125) -> ( b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0)
c  in CNF:
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨  b^{125, 2}_2
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨  b^{125, 2}_1
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨  p_125 ∨ -b^{125, 2}_0
c  in DIMACS:
-20183  20184 -20185  125  20186 0
-20183  20184 -20185  125  20187 0
-20183  20184 -20185  125 -20188 0

c  -2-1 --> break 
c    ( b^{125, 1}_2 ∧  b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧ -p_125) -> break
c  in CNF:
c    -b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨  b^{125, 1}_0 ∨  p_125 ∨ break
c  in DIMACS:
-20183 -20184  20185  125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 1}_2 ∧ -b^{125, 1}_1 ∧ -b^{125, 1}_0 ∧ true) 
c  in CNF:
c    -b^{125, 1}_2 ∨  b^{125, 1}_1 ∨  b^{125, 1}_0 ∨ false 
c  in DIMACS:
-20183  20184  20185  0

c  3 does not represent an automaton state.
c    -(-b^{125, 1}_2 ∧  b^{125, 1}_1 ∧  b^{125, 1}_0 ∧ true) 
c  in CNF:
c     b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ false 
c  in DIMACS:
 20183 -20184 -20185  0
c  -3 does not represent an automaton state.
c    -( b^{125, 1}_2 ∧  b^{125, 1}_1 ∧  b^{125, 1}_0 ∧ true) 
c  in CNF:
c    -b^{125, 1}_2 ∨ -b^{125, 1}_1 ∨ -b^{125, 1}_0 ∨ false 
c  in DIMACS:
-20183 -20184 -20185  0

c i = 2
c  -2+1 --> -1
c    ( b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧  p_250) -> ( b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0)
c  in CNF:
c    -b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨  b^{125, 3}_2
c    -b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_1
c    -b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨  b^{125, 3}_0
c  in DIMACS:
-20186 -20187  20188 -250  20189 0
-20186 -20187  20188 -250 -20190 0
-20186 -20187  20188 -250  20191 0

c  -1+1 --> 0
c    ( b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0 ∧  p_250) -> (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧ -b^{125, 3}_0)
c  in CNF:
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_2
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_1
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_0
c  in DIMACS:
-20186  20187 -20188 -250 -20189 0
-20186  20187 -20188 -250 -20190 0
-20186  20187 -20188 -250 -20191 0

c  0+1 --> 1
c    (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧  p_250) -> (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0)
c  in CNF:
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_2
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_1
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨  b^{125, 3}_0
c  in DIMACS:
 20186  20187  20188 -250 -20189 0
 20186  20187  20188 -250 -20190 0
 20186  20187  20188 -250  20191 0

c  1+1 --> 2
c    (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0 ∧  p_250) -> (-b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0)
c  in CNF:
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_2
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨  b^{125, 3}_1
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ -p_250 ∨ -b^{125, 3}_0
c  in DIMACS:
 20186  20187 -20188 -250 -20189 0
 20186  20187 -20188 -250  20190 0
 20186  20187 -20188 -250 -20191 0

c  2+1 --> break 
c    (-b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧  p_250) -> break
c  in CNF:
c     b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 20186 -20187  20188 -250 1162 0


c  2-1 --> 1
c    (-b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧ -p_250) -> (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0)
c  in CNF:
c     b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_2
c     b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_1
c     b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨  b^{125, 3}_0
c  in DIMACS:
 20186 -20187  20188  250 -20189 0
 20186 -20187  20188  250 -20190 0
 20186 -20187  20188  250  20191 0

c  1-1 --> 0
c    (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0 ∧ -p_250) -> (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧ -b^{125, 3}_0)
c  in CNF:
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_2
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_1
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_0
c  in DIMACS:
 20186  20187 -20188  250 -20189 0
 20186  20187 -20188  250 -20190 0
 20186  20187 -20188  250 -20191 0

c  0-1 --> -1
c    (-b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧ -p_250) -> ( b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0)
c  in CNF:
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨  b^{125, 3}_2
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_1
c     b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨  b^{125, 3}_0
c  in DIMACS:
 20186  20187  20188  250  20189 0
 20186  20187  20188  250 -20190 0
 20186  20187  20188  250  20191 0

c  -1-1 --> -2
c    ( b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧  b^{125, 2}_0 ∧ -p_250) -> ( b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0)
c  in CNF:
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨  b^{125, 3}_2
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨  b^{125, 3}_1
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨  p_250 ∨ -b^{125, 3}_0
c  in DIMACS:
-20186  20187 -20188  250  20189 0
-20186  20187 -20188  250  20190 0
-20186  20187 -20188  250 -20191 0

c  -2-1 --> break 
c    ( b^{125, 2}_2 ∧  b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨  b^{125, 2}_0 ∨  p_250 ∨ break
c  in DIMACS:
-20186 -20187  20188  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 2}_2 ∧ -b^{125, 2}_1 ∧ -b^{125, 2}_0 ∧ true) 
c  in CNF:
c    -b^{125, 2}_2 ∨  b^{125, 2}_1 ∨  b^{125, 2}_0 ∨ false 
c  in DIMACS:
-20186  20187  20188  0

c  3 does not represent an automaton state.
c    -(-b^{125, 2}_2 ∧  b^{125, 2}_1 ∧  b^{125, 2}_0 ∧ true) 
c  in CNF:
c     b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ false 
c  in DIMACS:
 20186 -20187 -20188  0
c  -3 does not represent an automaton state.
c    -( b^{125, 2}_2 ∧  b^{125, 2}_1 ∧  b^{125, 2}_0 ∧ true) 
c  in CNF:
c    -b^{125, 2}_2 ∨ -b^{125, 2}_1 ∨ -b^{125, 2}_0 ∨ false 
c  in DIMACS:
-20186 -20187 -20188  0

c i = 3
c  -2+1 --> -1
c    ( b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧  p_375) -> ( b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0)
c  in CNF:
c    -b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨  b^{125, 4}_2
c    -b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_1
c    -b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨  b^{125, 4}_0
c  in DIMACS:
-20189 -20190  20191 -375  20192 0
-20189 -20190  20191 -375 -20193 0
-20189 -20190  20191 -375  20194 0

c  -1+1 --> 0
c    ( b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0 ∧  p_375) -> (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧ -b^{125, 4}_0)
c  in CNF:
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_2
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_1
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_0
c  in DIMACS:
-20189  20190 -20191 -375 -20192 0
-20189  20190 -20191 -375 -20193 0
-20189  20190 -20191 -375 -20194 0

c  0+1 --> 1
c    (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧  p_375) -> (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0)
c  in CNF:
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_2
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_1
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨  b^{125, 4}_0
c  in DIMACS:
 20189  20190  20191 -375 -20192 0
 20189  20190  20191 -375 -20193 0
 20189  20190  20191 -375  20194 0

c  1+1 --> 2
c    (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0 ∧  p_375) -> (-b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0)
c  in CNF:
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_2
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨  b^{125, 4}_1
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ -p_375 ∨ -b^{125, 4}_0
c  in DIMACS:
 20189  20190 -20191 -375 -20192 0
 20189  20190 -20191 -375  20193 0
 20189  20190 -20191 -375 -20194 0

c  2+1 --> break 
c    (-b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧  p_375) -> break
c  in CNF:
c     b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 20189 -20190  20191 -375 1162 0


c  2-1 --> 1
c    (-b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧ -p_375) -> (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0)
c  in CNF:
c     b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_2
c     b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_1
c     b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨  b^{125, 4}_0
c  in DIMACS:
 20189 -20190  20191  375 -20192 0
 20189 -20190  20191  375 -20193 0
 20189 -20190  20191  375  20194 0

c  1-1 --> 0
c    (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0 ∧ -p_375) -> (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧ -b^{125, 4}_0)
c  in CNF:
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_2
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_1
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_0
c  in DIMACS:
 20189  20190 -20191  375 -20192 0
 20189  20190 -20191  375 -20193 0
 20189  20190 -20191  375 -20194 0

c  0-1 --> -1
c    (-b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧ -p_375) -> ( b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0)
c  in CNF:
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨  b^{125, 4}_2
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_1
c     b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨  b^{125, 4}_0
c  in DIMACS:
 20189  20190  20191  375  20192 0
 20189  20190  20191  375 -20193 0
 20189  20190  20191  375  20194 0

c  -1-1 --> -2
c    ( b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧  b^{125, 3}_0 ∧ -p_375) -> ( b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0)
c  in CNF:
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨  b^{125, 4}_2
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨  b^{125, 4}_1
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨  p_375 ∨ -b^{125, 4}_0
c  in DIMACS:
-20189  20190 -20191  375  20192 0
-20189  20190 -20191  375  20193 0
-20189  20190 -20191  375 -20194 0

c  -2-1 --> break 
c    ( b^{125, 3}_2 ∧  b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨  b^{125, 3}_0 ∨  p_375 ∨ break
c  in DIMACS:
-20189 -20190  20191  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 3}_2 ∧ -b^{125, 3}_1 ∧ -b^{125, 3}_0 ∧ true) 
c  in CNF:
c    -b^{125, 3}_2 ∨  b^{125, 3}_1 ∨  b^{125, 3}_0 ∨ false 
c  in DIMACS:
-20189  20190  20191  0

c  3 does not represent an automaton state.
c    -(-b^{125, 3}_2 ∧  b^{125, 3}_1 ∧  b^{125, 3}_0 ∧ true) 
c  in CNF:
c     b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ false 
c  in DIMACS:
 20189 -20190 -20191  0
c  -3 does not represent an automaton state.
c    -( b^{125, 3}_2 ∧  b^{125, 3}_1 ∧  b^{125, 3}_0 ∧ true) 
c  in CNF:
c    -b^{125, 3}_2 ∨ -b^{125, 3}_1 ∨ -b^{125, 3}_0 ∨ false 
c  in DIMACS:
-20189 -20190 -20191  0

c i = 4
c  -2+1 --> -1
c    ( b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧  p_500) -> ( b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0)
c  in CNF:
c    -b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨  b^{125, 5}_2
c    -b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_1
c    -b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨  b^{125, 5}_0
c  in DIMACS:
-20192 -20193  20194 -500  20195 0
-20192 -20193  20194 -500 -20196 0
-20192 -20193  20194 -500  20197 0

c  -1+1 --> 0
c    ( b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0 ∧  p_500) -> (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧ -b^{125, 5}_0)
c  in CNF:
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_2
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_1
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_0
c  in DIMACS:
-20192  20193 -20194 -500 -20195 0
-20192  20193 -20194 -500 -20196 0
-20192  20193 -20194 -500 -20197 0

c  0+1 --> 1
c    (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧  p_500) -> (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0)
c  in CNF:
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_2
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_1
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨  b^{125, 5}_0
c  in DIMACS:
 20192  20193  20194 -500 -20195 0
 20192  20193  20194 -500 -20196 0
 20192  20193  20194 -500  20197 0

c  1+1 --> 2
c    (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0 ∧  p_500) -> (-b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0)
c  in CNF:
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_2
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨  b^{125, 5}_1
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ -p_500 ∨ -b^{125, 5}_0
c  in DIMACS:
 20192  20193 -20194 -500 -20195 0
 20192  20193 -20194 -500  20196 0
 20192  20193 -20194 -500 -20197 0

c  2+1 --> break 
c    (-b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧  p_500) -> break
c  in CNF:
c     b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 20192 -20193  20194 -500 1162 0


c  2-1 --> 1
c    (-b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧ -p_500) -> (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0)
c  in CNF:
c     b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_2
c     b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_1
c     b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨  b^{125, 5}_0
c  in DIMACS:
 20192 -20193  20194  500 -20195 0
 20192 -20193  20194  500 -20196 0
 20192 -20193  20194  500  20197 0

c  1-1 --> 0
c    (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0 ∧ -p_500) -> (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧ -b^{125, 5}_0)
c  in CNF:
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_2
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_1
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_0
c  in DIMACS:
 20192  20193 -20194  500 -20195 0
 20192  20193 -20194  500 -20196 0
 20192  20193 -20194  500 -20197 0

c  0-1 --> -1
c    (-b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧ -p_500) -> ( b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0)
c  in CNF:
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨  b^{125, 5}_2
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_1
c     b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨  b^{125, 5}_0
c  in DIMACS:
 20192  20193  20194  500  20195 0
 20192  20193  20194  500 -20196 0
 20192  20193  20194  500  20197 0

c  -1-1 --> -2
c    ( b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧  b^{125, 4}_0 ∧ -p_500) -> ( b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0)
c  in CNF:
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨  b^{125, 5}_2
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨  b^{125, 5}_1
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨  p_500 ∨ -b^{125, 5}_0
c  in DIMACS:
-20192  20193 -20194  500  20195 0
-20192  20193 -20194  500  20196 0
-20192  20193 -20194  500 -20197 0

c  -2-1 --> break 
c    ( b^{125, 4}_2 ∧  b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨  b^{125, 4}_0 ∨  p_500 ∨ break
c  in DIMACS:
-20192 -20193  20194  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 4}_2 ∧ -b^{125, 4}_1 ∧ -b^{125, 4}_0 ∧ true) 
c  in CNF:
c    -b^{125, 4}_2 ∨  b^{125, 4}_1 ∨  b^{125, 4}_0 ∨ false 
c  in DIMACS:
-20192  20193  20194  0

c  3 does not represent an automaton state.
c    -(-b^{125, 4}_2 ∧  b^{125, 4}_1 ∧  b^{125, 4}_0 ∧ true) 
c  in CNF:
c     b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ false 
c  in DIMACS:
 20192 -20193 -20194  0
c  -3 does not represent an automaton state.
c    -( b^{125, 4}_2 ∧  b^{125, 4}_1 ∧  b^{125, 4}_0 ∧ true) 
c  in CNF:
c    -b^{125, 4}_2 ∨ -b^{125, 4}_1 ∨ -b^{125, 4}_0 ∨ false 
c  in DIMACS:
-20192 -20193 -20194  0

c i = 5
c  -2+1 --> -1
c    ( b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧  p_625) -> ( b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0)
c  in CNF:
c    -b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨  b^{125, 6}_2
c    -b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_1
c    -b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨  b^{125, 6}_0
c  in DIMACS:
-20195 -20196  20197 -625  20198 0
-20195 -20196  20197 -625 -20199 0
-20195 -20196  20197 -625  20200 0

c  -1+1 --> 0
c    ( b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0 ∧  p_625) -> (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧ -b^{125, 6}_0)
c  in CNF:
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_2
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_1
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_0
c  in DIMACS:
-20195  20196 -20197 -625 -20198 0
-20195  20196 -20197 -625 -20199 0
-20195  20196 -20197 -625 -20200 0

c  0+1 --> 1
c    (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧  p_625) -> (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0)
c  in CNF:
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_2
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_1
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨  b^{125, 6}_0
c  in DIMACS:
 20195  20196  20197 -625 -20198 0
 20195  20196  20197 -625 -20199 0
 20195  20196  20197 -625  20200 0

c  1+1 --> 2
c    (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0 ∧  p_625) -> (-b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0)
c  in CNF:
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_2
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨  b^{125, 6}_1
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ -p_625 ∨ -b^{125, 6}_0
c  in DIMACS:
 20195  20196 -20197 -625 -20198 0
 20195  20196 -20197 -625  20199 0
 20195  20196 -20197 -625 -20200 0

c  2+1 --> break 
c    (-b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧  p_625) -> break
c  in CNF:
c     b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ -p_625 ∨ break
c  in DIMACS:
 20195 -20196  20197 -625 1162 0


c  2-1 --> 1
c    (-b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧ -p_625) -> (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0)
c  in CNF:
c     b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_2
c     b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_1
c     b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨  b^{125, 6}_0
c  in DIMACS:
 20195 -20196  20197  625 -20198 0
 20195 -20196  20197  625 -20199 0
 20195 -20196  20197  625  20200 0

c  1-1 --> 0
c    (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0 ∧ -p_625) -> (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧ -b^{125, 6}_0)
c  in CNF:
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_2
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_1
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_0
c  in DIMACS:
 20195  20196 -20197  625 -20198 0
 20195  20196 -20197  625 -20199 0
 20195  20196 -20197  625 -20200 0

c  0-1 --> -1
c    (-b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧ -p_625) -> ( b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0)
c  in CNF:
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨  b^{125, 6}_2
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_1
c     b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨  b^{125, 6}_0
c  in DIMACS:
 20195  20196  20197  625  20198 0
 20195  20196  20197  625 -20199 0
 20195  20196  20197  625  20200 0

c  -1-1 --> -2
c    ( b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧  b^{125, 5}_0 ∧ -p_625) -> ( b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0)
c  in CNF:
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨  b^{125, 6}_2
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨  b^{125, 6}_1
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨  p_625 ∨ -b^{125, 6}_0
c  in DIMACS:
-20195  20196 -20197  625  20198 0
-20195  20196 -20197  625  20199 0
-20195  20196 -20197  625 -20200 0

c  -2-1 --> break 
c    ( b^{125, 5}_2 ∧  b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧ -p_625) -> break
c  in CNF:
c    -b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨  b^{125, 5}_0 ∨  p_625 ∨ break
c  in DIMACS:
-20195 -20196  20197  625 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 5}_2 ∧ -b^{125, 5}_1 ∧ -b^{125, 5}_0 ∧ true) 
c  in CNF:
c    -b^{125, 5}_2 ∨  b^{125, 5}_1 ∨  b^{125, 5}_0 ∨ false 
c  in DIMACS:
-20195  20196  20197  0

c  3 does not represent an automaton state.
c    -(-b^{125, 5}_2 ∧  b^{125, 5}_1 ∧  b^{125, 5}_0 ∧ true) 
c  in CNF:
c     b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ false 
c  in DIMACS:
 20195 -20196 -20197  0
c  -3 does not represent an automaton state.
c    -( b^{125, 5}_2 ∧  b^{125, 5}_1 ∧  b^{125, 5}_0 ∧ true) 
c  in CNF:
c    -b^{125, 5}_2 ∨ -b^{125, 5}_1 ∨ -b^{125, 5}_0 ∨ false 
c  in DIMACS:
-20195 -20196 -20197  0

c i = 6
c  -2+1 --> -1
c    ( b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧  p_750) -> ( b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0)
c  in CNF:
c    -b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨  b^{125, 7}_2
c    -b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_1
c    -b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨  b^{125, 7}_0
c  in DIMACS:
-20198 -20199  20200 -750  20201 0
-20198 -20199  20200 -750 -20202 0
-20198 -20199  20200 -750  20203 0

c  -1+1 --> 0
c    ( b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0 ∧  p_750) -> (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧ -b^{125, 7}_0)
c  in CNF:
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_2
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_1
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_0
c  in DIMACS:
-20198  20199 -20200 -750 -20201 0
-20198  20199 -20200 -750 -20202 0
-20198  20199 -20200 -750 -20203 0

c  0+1 --> 1
c    (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧  p_750) -> (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0)
c  in CNF:
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_2
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_1
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨  b^{125, 7}_0
c  in DIMACS:
 20198  20199  20200 -750 -20201 0
 20198  20199  20200 -750 -20202 0
 20198  20199  20200 -750  20203 0

c  1+1 --> 2
c    (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0 ∧  p_750) -> (-b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0)
c  in CNF:
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_2
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨  b^{125, 7}_1
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ -p_750 ∨ -b^{125, 7}_0
c  in DIMACS:
 20198  20199 -20200 -750 -20201 0
 20198  20199 -20200 -750  20202 0
 20198  20199 -20200 -750 -20203 0

c  2+1 --> break 
c    (-b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧  p_750) -> break
c  in CNF:
c     b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 20198 -20199  20200 -750 1162 0


c  2-1 --> 1
c    (-b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧ -p_750) -> (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0)
c  in CNF:
c     b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_2
c     b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_1
c     b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨  b^{125, 7}_0
c  in DIMACS:
 20198 -20199  20200  750 -20201 0
 20198 -20199  20200  750 -20202 0
 20198 -20199  20200  750  20203 0

c  1-1 --> 0
c    (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0 ∧ -p_750) -> (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧ -b^{125, 7}_0)
c  in CNF:
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_2
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_1
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_0
c  in DIMACS:
 20198  20199 -20200  750 -20201 0
 20198  20199 -20200  750 -20202 0
 20198  20199 -20200  750 -20203 0

c  0-1 --> -1
c    (-b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧ -p_750) -> ( b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0)
c  in CNF:
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨  b^{125, 7}_2
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_1
c     b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨  b^{125, 7}_0
c  in DIMACS:
 20198  20199  20200  750  20201 0
 20198  20199  20200  750 -20202 0
 20198  20199  20200  750  20203 0

c  -1-1 --> -2
c    ( b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧  b^{125, 6}_0 ∧ -p_750) -> ( b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0)
c  in CNF:
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨  b^{125, 7}_2
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨  b^{125, 7}_1
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨  p_750 ∨ -b^{125, 7}_0
c  in DIMACS:
-20198  20199 -20200  750  20201 0
-20198  20199 -20200  750  20202 0
-20198  20199 -20200  750 -20203 0

c  -2-1 --> break 
c    ( b^{125, 6}_2 ∧  b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨  b^{125, 6}_0 ∨  p_750 ∨ break
c  in DIMACS:
-20198 -20199  20200  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 6}_2 ∧ -b^{125, 6}_1 ∧ -b^{125, 6}_0 ∧ true) 
c  in CNF:
c    -b^{125, 6}_2 ∨  b^{125, 6}_1 ∨  b^{125, 6}_0 ∨ false 
c  in DIMACS:
-20198  20199  20200  0

c  3 does not represent an automaton state.
c    -(-b^{125, 6}_2 ∧  b^{125, 6}_1 ∧  b^{125, 6}_0 ∧ true) 
c  in CNF:
c     b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ false 
c  in DIMACS:
 20198 -20199 -20200  0
c  -3 does not represent an automaton state.
c    -( b^{125, 6}_2 ∧  b^{125, 6}_1 ∧  b^{125, 6}_0 ∧ true) 
c  in CNF:
c    -b^{125, 6}_2 ∨ -b^{125, 6}_1 ∨ -b^{125, 6}_0 ∨ false 
c  in DIMACS:
-20198 -20199 -20200  0

c i = 7
c  -2+1 --> -1
c    ( b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧  p_875) -> ( b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0)
c  in CNF:
c    -b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨  b^{125, 8}_2
c    -b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_1
c    -b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨  b^{125, 8}_0
c  in DIMACS:
-20201 -20202  20203 -875  20204 0
-20201 -20202  20203 -875 -20205 0
-20201 -20202  20203 -875  20206 0

c  -1+1 --> 0
c    ( b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0 ∧  p_875) -> (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧ -b^{125, 8}_0)
c  in CNF:
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_2
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_1
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_0
c  in DIMACS:
-20201  20202 -20203 -875 -20204 0
-20201  20202 -20203 -875 -20205 0
-20201  20202 -20203 -875 -20206 0

c  0+1 --> 1
c    (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧  p_875) -> (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0)
c  in CNF:
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_2
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_1
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨  b^{125, 8}_0
c  in DIMACS:
 20201  20202  20203 -875 -20204 0
 20201  20202  20203 -875 -20205 0
 20201  20202  20203 -875  20206 0

c  1+1 --> 2
c    (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0 ∧  p_875) -> (-b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0)
c  in CNF:
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_2
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨  b^{125, 8}_1
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ -p_875 ∨ -b^{125, 8}_0
c  in DIMACS:
 20201  20202 -20203 -875 -20204 0
 20201  20202 -20203 -875  20205 0
 20201  20202 -20203 -875 -20206 0

c  2+1 --> break 
c    (-b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧  p_875) -> break
c  in CNF:
c     b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 20201 -20202  20203 -875 1162 0


c  2-1 --> 1
c    (-b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧ -p_875) -> (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0)
c  in CNF:
c     b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_2
c     b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_1
c     b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨  b^{125, 8}_0
c  in DIMACS:
 20201 -20202  20203  875 -20204 0
 20201 -20202  20203  875 -20205 0
 20201 -20202  20203  875  20206 0

c  1-1 --> 0
c    (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0 ∧ -p_875) -> (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧ -b^{125, 8}_0)
c  in CNF:
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_2
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_1
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_0
c  in DIMACS:
 20201  20202 -20203  875 -20204 0
 20201  20202 -20203  875 -20205 0
 20201  20202 -20203  875 -20206 0

c  0-1 --> -1
c    (-b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧ -p_875) -> ( b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0)
c  in CNF:
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨  b^{125, 8}_2
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_1
c     b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨  b^{125, 8}_0
c  in DIMACS:
 20201  20202  20203  875  20204 0
 20201  20202  20203  875 -20205 0
 20201  20202  20203  875  20206 0

c  -1-1 --> -2
c    ( b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧  b^{125, 7}_0 ∧ -p_875) -> ( b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0)
c  in CNF:
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨  b^{125, 8}_2
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨  b^{125, 8}_1
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨  p_875 ∨ -b^{125, 8}_0
c  in DIMACS:
-20201  20202 -20203  875  20204 0
-20201  20202 -20203  875  20205 0
-20201  20202 -20203  875 -20206 0

c  -2-1 --> break 
c    ( b^{125, 7}_2 ∧  b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨  b^{125, 7}_0 ∨  p_875 ∨ break
c  in DIMACS:
-20201 -20202  20203  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 7}_2 ∧ -b^{125, 7}_1 ∧ -b^{125, 7}_0 ∧ true) 
c  in CNF:
c    -b^{125, 7}_2 ∨  b^{125, 7}_1 ∨  b^{125, 7}_0 ∨ false 
c  in DIMACS:
-20201  20202  20203  0

c  3 does not represent an automaton state.
c    -(-b^{125, 7}_2 ∧  b^{125, 7}_1 ∧  b^{125, 7}_0 ∧ true) 
c  in CNF:
c     b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ false 
c  in DIMACS:
 20201 -20202 -20203  0
c  -3 does not represent an automaton state.
c    -( b^{125, 7}_2 ∧  b^{125, 7}_1 ∧  b^{125, 7}_0 ∧ true) 
c  in CNF:
c    -b^{125, 7}_2 ∨ -b^{125, 7}_1 ∨ -b^{125, 7}_0 ∨ false 
c  in DIMACS:
-20201 -20202 -20203  0

c i = 8
c  -2+1 --> -1
c    ( b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧  p_1000) -> ( b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0)
c  in CNF:
c    -b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨  b^{125, 9}_2
c    -b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_1
c    -b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨  b^{125, 9}_0
c  in DIMACS:
-20204 -20205  20206 -1000  20207 0
-20204 -20205  20206 -1000 -20208 0
-20204 -20205  20206 -1000  20209 0

c  -1+1 --> 0
c    ( b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0 ∧  p_1000) -> (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧ -b^{125, 9}_0)
c  in CNF:
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_2
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_1
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_0
c  in DIMACS:
-20204  20205 -20206 -1000 -20207 0
-20204  20205 -20206 -1000 -20208 0
-20204  20205 -20206 -1000 -20209 0

c  0+1 --> 1
c    (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧  p_1000) -> (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0)
c  in CNF:
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_2
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_1
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨  b^{125, 9}_0
c  in DIMACS:
 20204  20205  20206 -1000 -20207 0
 20204  20205  20206 -1000 -20208 0
 20204  20205  20206 -1000  20209 0

c  1+1 --> 2
c    (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0 ∧  p_1000) -> (-b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0)
c  in CNF:
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_2
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨  b^{125, 9}_1
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ -p_1000 ∨ -b^{125, 9}_0
c  in DIMACS:
 20204  20205 -20206 -1000 -20207 0
 20204  20205 -20206 -1000  20208 0
 20204  20205 -20206 -1000 -20209 0

c  2+1 --> break 
c    (-b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 20204 -20205  20206 -1000 1162 0


c  2-1 --> 1
c    (-b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧ -p_1000) -> (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0)
c  in CNF:
c     b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_2
c     b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_1
c     b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨  b^{125, 9}_0
c  in DIMACS:
 20204 -20205  20206  1000 -20207 0
 20204 -20205  20206  1000 -20208 0
 20204 -20205  20206  1000  20209 0

c  1-1 --> 0
c    (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0 ∧ -p_1000) -> (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧ -b^{125, 9}_0)
c  in CNF:
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_2
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_1
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_0
c  in DIMACS:
 20204  20205 -20206  1000 -20207 0
 20204  20205 -20206  1000 -20208 0
 20204  20205 -20206  1000 -20209 0

c  0-1 --> -1
c    (-b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧ -p_1000) -> ( b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0)
c  in CNF:
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨  b^{125, 9}_2
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_1
c     b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨  b^{125, 9}_0
c  in DIMACS:
 20204  20205  20206  1000  20207 0
 20204  20205  20206  1000 -20208 0
 20204  20205  20206  1000  20209 0

c  -1-1 --> -2
c    ( b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧  b^{125, 8}_0 ∧ -p_1000) -> ( b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0)
c  in CNF:
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨  b^{125, 9}_2
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨  b^{125, 9}_1
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨  p_1000 ∨ -b^{125, 9}_0
c  in DIMACS:
-20204  20205 -20206  1000  20207 0
-20204  20205 -20206  1000  20208 0
-20204  20205 -20206  1000 -20209 0

c  -2-1 --> break 
c    ( b^{125, 8}_2 ∧  b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨  b^{125, 8}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-20204 -20205  20206  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 8}_2 ∧ -b^{125, 8}_1 ∧ -b^{125, 8}_0 ∧ true) 
c  in CNF:
c    -b^{125, 8}_2 ∨  b^{125, 8}_1 ∨  b^{125, 8}_0 ∨ false 
c  in DIMACS:
-20204  20205  20206  0

c  3 does not represent an automaton state.
c    -(-b^{125, 8}_2 ∧  b^{125, 8}_1 ∧  b^{125, 8}_0 ∧ true) 
c  in CNF:
c     b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ false 
c  in DIMACS:
 20204 -20205 -20206  0
c  -3 does not represent an automaton state.
c    -( b^{125, 8}_2 ∧  b^{125, 8}_1 ∧  b^{125, 8}_0 ∧ true) 
c  in CNF:
c    -b^{125, 8}_2 ∨ -b^{125, 8}_1 ∨ -b^{125, 8}_0 ∨ false 
c  in DIMACS:
-20204 -20205 -20206  0

c i = 9
c  -2+1 --> -1
c    ( b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧  p_1125) -> ( b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧  b^{125, 10}_0)
c  in CNF:
c    -b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨  b^{125, 10}_2
c    -b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_1
c    -b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨  b^{125, 10}_0
c  in DIMACS:
-20207 -20208  20209 -1125  20210 0
-20207 -20208  20209 -1125 -20211 0
-20207 -20208  20209 -1125  20212 0

c  -1+1 --> 0
c    ( b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0 ∧  p_1125) -> (-b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧ -b^{125, 10}_0)
c  in CNF:
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_2
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_1
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_0
c  in DIMACS:
-20207  20208 -20209 -1125 -20210 0
-20207  20208 -20209 -1125 -20211 0
-20207  20208 -20209 -1125 -20212 0

c  0+1 --> 1
c    (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧  p_1125) -> (-b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧  b^{125, 10}_0)
c  in CNF:
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_2
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_1
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨  b^{125, 10}_0
c  in DIMACS:
 20207  20208  20209 -1125 -20210 0
 20207  20208  20209 -1125 -20211 0
 20207  20208  20209 -1125  20212 0

c  1+1 --> 2
c    (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0 ∧  p_1125) -> (-b^{125, 10}_2 ∧  b^{125, 10}_1 ∧ -b^{125, 10}_0)
c  in CNF:
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_2
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨  b^{125, 10}_1
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ -p_1125 ∨ -b^{125, 10}_0
c  in DIMACS:
 20207  20208 -20209 -1125 -20210 0
 20207  20208 -20209 -1125  20211 0
 20207  20208 -20209 -1125 -20212 0

c  2+1 --> break 
c    (-b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 20207 -20208  20209 -1125 1162 0


c  2-1 --> 1
c    (-b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧ -p_1125) -> (-b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧  b^{125, 10}_0)
c  in CNF:
c     b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_2
c     b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_1
c     b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨  b^{125, 10}_0
c  in DIMACS:
 20207 -20208  20209  1125 -20210 0
 20207 -20208  20209  1125 -20211 0
 20207 -20208  20209  1125  20212 0

c  1-1 --> 0
c    (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0 ∧ -p_1125) -> (-b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧ -b^{125, 10}_0)
c  in CNF:
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_2
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_1
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_0
c  in DIMACS:
 20207  20208 -20209  1125 -20210 0
 20207  20208 -20209  1125 -20211 0
 20207  20208 -20209  1125 -20212 0

c  0-1 --> -1
c    (-b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧ -p_1125) -> ( b^{125, 10}_2 ∧ -b^{125, 10}_1 ∧  b^{125, 10}_0)
c  in CNF:
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨  b^{125, 10}_2
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_1
c     b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨  b^{125, 10}_0
c  in DIMACS:
 20207  20208  20209  1125  20210 0
 20207  20208  20209  1125 -20211 0
 20207  20208  20209  1125  20212 0

c  -1-1 --> -2
c    ( b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧  b^{125, 9}_0 ∧ -p_1125) -> ( b^{125, 10}_2 ∧  b^{125, 10}_1 ∧ -b^{125, 10}_0)
c  in CNF:
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨  b^{125, 10}_2
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨  b^{125, 10}_1
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨  p_1125 ∨ -b^{125, 10}_0
c  in DIMACS:
-20207  20208 -20209  1125  20210 0
-20207  20208 -20209  1125  20211 0
-20207  20208 -20209  1125 -20212 0

c  -2-1 --> break 
c    ( b^{125, 9}_2 ∧  b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨  b^{125, 9}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-20207 -20208  20209  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{125, 9}_2 ∧ -b^{125, 9}_1 ∧ -b^{125, 9}_0 ∧ true) 
c  in CNF:
c    -b^{125, 9}_2 ∨  b^{125, 9}_1 ∨  b^{125, 9}_0 ∨ false 
c  in DIMACS:
-20207  20208  20209  0

c  3 does not represent an automaton state.
c    -(-b^{125, 9}_2 ∧  b^{125, 9}_1 ∧  b^{125, 9}_0 ∧ true) 
c  in CNF:
c     b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ false 
c  in DIMACS:
 20207 -20208 -20209  0
c  -3 does not represent an automaton state.
c    -( b^{125, 9}_2 ∧  b^{125, 9}_1 ∧  b^{125, 9}_0 ∧ true) 
c  in CNF:
c    -b^{125, 9}_2 ∨ -b^{125, 9}_1 ∨ -b^{125, 9}_0 ∨ false 
c  in DIMACS:
-20207 -20208 -20209  0

c INIT for k = 126
c    -b^{126, 1}_2
c    -b^{126, 1}_1
c    -b^{126, 1}_0
c  in DIMACS:
-20213 0
-20214 0
-20215 0

c Transitions for k = 126
c i = 1
c  -2+1 --> -1
c    ( b^{126, 1}_2 ∧  b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧  p_126) -> ( b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0)
c  in CNF:
c    -b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨  b^{126, 2}_2
c    -b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_1
c    -b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨  b^{126, 2}_0
c  in DIMACS:
-20213 -20214  20215 -126  20216 0
-20213 -20214  20215 -126 -20217 0
-20213 -20214  20215 -126  20218 0

c  -1+1 --> 0
c    ( b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧  b^{126, 1}_0 ∧  p_126) -> (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧ -b^{126, 2}_0)
c  in CNF:
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_2
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_1
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_0
c  in DIMACS:
-20213  20214 -20215 -126 -20216 0
-20213  20214 -20215 -126 -20217 0
-20213  20214 -20215 -126 -20218 0

c  0+1 --> 1
c    (-b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧  p_126) -> (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0)
c  in CNF:
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_2
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_1
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨  b^{126, 2}_0
c  in DIMACS:
 20213  20214  20215 -126 -20216 0
 20213  20214  20215 -126 -20217 0
 20213  20214  20215 -126  20218 0

c  1+1 --> 2
c    (-b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧  b^{126, 1}_0 ∧  p_126) -> (-b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0)
c  in CNF:
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_2
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨  b^{126, 2}_1
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ -p_126 ∨ -b^{126, 2}_0
c  in DIMACS:
 20213  20214 -20215 -126 -20216 0
 20213  20214 -20215 -126  20217 0
 20213  20214 -20215 -126 -20218 0

c  2+1 --> break 
c    (-b^{126, 1}_2 ∧  b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧  p_126) -> break
c  in CNF:
c     b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ -p_126 ∨ break
c  in DIMACS:
 20213 -20214  20215 -126 1162 0


c  2-1 --> 1
c    (-b^{126, 1}_2 ∧  b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧ -p_126) -> (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0)
c  in CNF:
c     b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_2
c     b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_1
c     b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨  b^{126, 2}_0
c  in DIMACS:
 20213 -20214  20215  126 -20216 0
 20213 -20214  20215  126 -20217 0
 20213 -20214  20215  126  20218 0

c  1-1 --> 0
c    (-b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧  b^{126, 1}_0 ∧ -p_126) -> (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧ -b^{126, 2}_0)
c  in CNF:
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_2
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_1
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_0
c  in DIMACS:
 20213  20214 -20215  126 -20216 0
 20213  20214 -20215  126 -20217 0
 20213  20214 -20215  126 -20218 0

c  0-1 --> -1
c    (-b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧ -p_126) -> ( b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0)
c  in CNF:
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨  b^{126, 2}_2
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_1
c     b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨  b^{126, 2}_0
c  in DIMACS:
 20213  20214  20215  126  20216 0
 20213  20214  20215  126 -20217 0
 20213  20214  20215  126  20218 0

c  -1-1 --> -2
c    ( b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧  b^{126, 1}_0 ∧ -p_126) -> ( b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0)
c  in CNF:
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨  b^{126, 2}_2
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨  b^{126, 2}_1
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨  p_126 ∨ -b^{126, 2}_0
c  in DIMACS:
-20213  20214 -20215  126  20216 0
-20213  20214 -20215  126  20217 0
-20213  20214 -20215  126 -20218 0

c  -2-1 --> break 
c    ( b^{126, 1}_2 ∧  b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧ -p_126) -> break
c  in CNF:
c    -b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨  b^{126, 1}_0 ∨  p_126 ∨ break
c  in DIMACS:
-20213 -20214  20215  126 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 1}_2 ∧ -b^{126, 1}_1 ∧ -b^{126, 1}_0 ∧ true) 
c  in CNF:
c    -b^{126, 1}_2 ∨  b^{126, 1}_1 ∨  b^{126, 1}_0 ∨ false 
c  in DIMACS:
-20213  20214  20215  0

c  3 does not represent an automaton state.
c    -(-b^{126, 1}_2 ∧  b^{126, 1}_1 ∧  b^{126, 1}_0 ∧ true) 
c  in CNF:
c     b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ false 
c  in DIMACS:
 20213 -20214 -20215  0
c  -3 does not represent an automaton state.
c    -( b^{126, 1}_2 ∧  b^{126, 1}_1 ∧  b^{126, 1}_0 ∧ true) 
c  in CNF:
c    -b^{126, 1}_2 ∨ -b^{126, 1}_1 ∨ -b^{126, 1}_0 ∨ false 
c  in DIMACS:
-20213 -20214 -20215  0

c i = 2
c  -2+1 --> -1
c    ( b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧  p_252) -> ( b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0)
c  in CNF:
c    -b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨  b^{126, 3}_2
c    -b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_1
c    -b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨  b^{126, 3}_0
c  in DIMACS:
-20216 -20217  20218 -252  20219 0
-20216 -20217  20218 -252 -20220 0
-20216 -20217  20218 -252  20221 0

c  -1+1 --> 0
c    ( b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0 ∧  p_252) -> (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧ -b^{126, 3}_0)
c  in CNF:
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_2
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_1
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_0
c  in DIMACS:
-20216  20217 -20218 -252 -20219 0
-20216  20217 -20218 -252 -20220 0
-20216  20217 -20218 -252 -20221 0

c  0+1 --> 1
c    (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧  p_252) -> (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0)
c  in CNF:
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_2
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_1
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨  b^{126, 3}_0
c  in DIMACS:
 20216  20217  20218 -252 -20219 0
 20216  20217  20218 -252 -20220 0
 20216  20217  20218 -252  20221 0

c  1+1 --> 2
c    (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0 ∧  p_252) -> (-b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0)
c  in CNF:
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_2
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨  b^{126, 3}_1
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ -p_252 ∨ -b^{126, 3}_0
c  in DIMACS:
 20216  20217 -20218 -252 -20219 0
 20216  20217 -20218 -252  20220 0
 20216  20217 -20218 -252 -20221 0

c  2+1 --> break 
c    (-b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧  p_252) -> break
c  in CNF:
c     b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 20216 -20217  20218 -252 1162 0


c  2-1 --> 1
c    (-b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧ -p_252) -> (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0)
c  in CNF:
c     b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_2
c     b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_1
c     b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨  b^{126, 3}_0
c  in DIMACS:
 20216 -20217  20218  252 -20219 0
 20216 -20217  20218  252 -20220 0
 20216 -20217  20218  252  20221 0

c  1-1 --> 0
c    (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0 ∧ -p_252) -> (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧ -b^{126, 3}_0)
c  in CNF:
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_2
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_1
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_0
c  in DIMACS:
 20216  20217 -20218  252 -20219 0
 20216  20217 -20218  252 -20220 0
 20216  20217 -20218  252 -20221 0

c  0-1 --> -1
c    (-b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧ -p_252) -> ( b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0)
c  in CNF:
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨  b^{126, 3}_2
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_1
c     b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨  b^{126, 3}_0
c  in DIMACS:
 20216  20217  20218  252  20219 0
 20216  20217  20218  252 -20220 0
 20216  20217  20218  252  20221 0

c  -1-1 --> -2
c    ( b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧  b^{126, 2}_0 ∧ -p_252) -> ( b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0)
c  in CNF:
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨  b^{126, 3}_2
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨  b^{126, 3}_1
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨  p_252 ∨ -b^{126, 3}_0
c  in DIMACS:
-20216  20217 -20218  252  20219 0
-20216  20217 -20218  252  20220 0
-20216  20217 -20218  252 -20221 0

c  -2-1 --> break 
c    ( b^{126, 2}_2 ∧  b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨  b^{126, 2}_0 ∨  p_252 ∨ break
c  in DIMACS:
-20216 -20217  20218  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 2}_2 ∧ -b^{126, 2}_1 ∧ -b^{126, 2}_0 ∧ true) 
c  in CNF:
c    -b^{126, 2}_2 ∨  b^{126, 2}_1 ∨  b^{126, 2}_0 ∨ false 
c  in DIMACS:
-20216  20217  20218  0

c  3 does not represent an automaton state.
c    -(-b^{126, 2}_2 ∧  b^{126, 2}_1 ∧  b^{126, 2}_0 ∧ true) 
c  in CNF:
c     b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ false 
c  in DIMACS:
 20216 -20217 -20218  0
c  -3 does not represent an automaton state.
c    -( b^{126, 2}_2 ∧  b^{126, 2}_1 ∧  b^{126, 2}_0 ∧ true) 
c  in CNF:
c    -b^{126, 2}_2 ∨ -b^{126, 2}_1 ∨ -b^{126, 2}_0 ∨ false 
c  in DIMACS:
-20216 -20217 -20218  0

c i = 3
c  -2+1 --> -1
c    ( b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧  p_378) -> ( b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0)
c  in CNF:
c    -b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨  b^{126, 4}_2
c    -b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_1
c    -b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨  b^{126, 4}_0
c  in DIMACS:
-20219 -20220  20221 -378  20222 0
-20219 -20220  20221 -378 -20223 0
-20219 -20220  20221 -378  20224 0

c  -1+1 --> 0
c    ( b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0 ∧  p_378) -> (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧ -b^{126, 4}_0)
c  in CNF:
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_2
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_1
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_0
c  in DIMACS:
-20219  20220 -20221 -378 -20222 0
-20219  20220 -20221 -378 -20223 0
-20219  20220 -20221 -378 -20224 0

c  0+1 --> 1
c    (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧  p_378) -> (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0)
c  in CNF:
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_2
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_1
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨  b^{126, 4}_0
c  in DIMACS:
 20219  20220  20221 -378 -20222 0
 20219  20220  20221 -378 -20223 0
 20219  20220  20221 -378  20224 0

c  1+1 --> 2
c    (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0 ∧  p_378) -> (-b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0)
c  in CNF:
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_2
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨  b^{126, 4}_1
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ -p_378 ∨ -b^{126, 4}_0
c  in DIMACS:
 20219  20220 -20221 -378 -20222 0
 20219  20220 -20221 -378  20223 0
 20219  20220 -20221 -378 -20224 0

c  2+1 --> break 
c    (-b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧  p_378) -> break
c  in CNF:
c     b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 20219 -20220  20221 -378 1162 0


c  2-1 --> 1
c    (-b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧ -p_378) -> (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0)
c  in CNF:
c     b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_2
c     b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_1
c     b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨  b^{126, 4}_0
c  in DIMACS:
 20219 -20220  20221  378 -20222 0
 20219 -20220  20221  378 -20223 0
 20219 -20220  20221  378  20224 0

c  1-1 --> 0
c    (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0 ∧ -p_378) -> (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧ -b^{126, 4}_0)
c  in CNF:
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_2
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_1
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_0
c  in DIMACS:
 20219  20220 -20221  378 -20222 0
 20219  20220 -20221  378 -20223 0
 20219  20220 -20221  378 -20224 0

c  0-1 --> -1
c    (-b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧ -p_378) -> ( b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0)
c  in CNF:
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨  b^{126, 4}_2
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_1
c     b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨  b^{126, 4}_0
c  in DIMACS:
 20219  20220  20221  378  20222 0
 20219  20220  20221  378 -20223 0
 20219  20220  20221  378  20224 0

c  -1-1 --> -2
c    ( b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧  b^{126, 3}_0 ∧ -p_378) -> ( b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0)
c  in CNF:
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨  b^{126, 4}_2
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨  b^{126, 4}_1
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨  p_378 ∨ -b^{126, 4}_0
c  in DIMACS:
-20219  20220 -20221  378  20222 0
-20219  20220 -20221  378  20223 0
-20219  20220 -20221  378 -20224 0

c  -2-1 --> break 
c    ( b^{126, 3}_2 ∧  b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨  b^{126, 3}_0 ∨  p_378 ∨ break
c  in DIMACS:
-20219 -20220  20221  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 3}_2 ∧ -b^{126, 3}_1 ∧ -b^{126, 3}_0 ∧ true) 
c  in CNF:
c    -b^{126, 3}_2 ∨  b^{126, 3}_1 ∨  b^{126, 3}_0 ∨ false 
c  in DIMACS:
-20219  20220  20221  0

c  3 does not represent an automaton state.
c    -(-b^{126, 3}_2 ∧  b^{126, 3}_1 ∧  b^{126, 3}_0 ∧ true) 
c  in CNF:
c     b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ false 
c  in DIMACS:
 20219 -20220 -20221  0
c  -3 does not represent an automaton state.
c    -( b^{126, 3}_2 ∧  b^{126, 3}_1 ∧  b^{126, 3}_0 ∧ true) 
c  in CNF:
c    -b^{126, 3}_2 ∨ -b^{126, 3}_1 ∨ -b^{126, 3}_0 ∨ false 
c  in DIMACS:
-20219 -20220 -20221  0

c i = 4
c  -2+1 --> -1
c    ( b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧  p_504) -> ( b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0)
c  in CNF:
c    -b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨  b^{126, 5}_2
c    -b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_1
c    -b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨  b^{126, 5}_0
c  in DIMACS:
-20222 -20223  20224 -504  20225 0
-20222 -20223  20224 -504 -20226 0
-20222 -20223  20224 -504  20227 0

c  -1+1 --> 0
c    ( b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0 ∧  p_504) -> (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧ -b^{126, 5}_0)
c  in CNF:
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_2
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_1
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_0
c  in DIMACS:
-20222  20223 -20224 -504 -20225 0
-20222  20223 -20224 -504 -20226 0
-20222  20223 -20224 -504 -20227 0

c  0+1 --> 1
c    (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧  p_504) -> (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0)
c  in CNF:
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_2
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_1
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨  b^{126, 5}_0
c  in DIMACS:
 20222  20223  20224 -504 -20225 0
 20222  20223  20224 -504 -20226 0
 20222  20223  20224 -504  20227 0

c  1+1 --> 2
c    (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0 ∧  p_504) -> (-b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0)
c  in CNF:
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_2
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨  b^{126, 5}_1
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ -p_504 ∨ -b^{126, 5}_0
c  in DIMACS:
 20222  20223 -20224 -504 -20225 0
 20222  20223 -20224 -504  20226 0
 20222  20223 -20224 -504 -20227 0

c  2+1 --> break 
c    (-b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧  p_504) -> break
c  in CNF:
c     b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 20222 -20223  20224 -504 1162 0


c  2-1 --> 1
c    (-b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧ -p_504) -> (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0)
c  in CNF:
c     b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_2
c     b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_1
c     b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨  b^{126, 5}_0
c  in DIMACS:
 20222 -20223  20224  504 -20225 0
 20222 -20223  20224  504 -20226 0
 20222 -20223  20224  504  20227 0

c  1-1 --> 0
c    (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0 ∧ -p_504) -> (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧ -b^{126, 5}_0)
c  in CNF:
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_2
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_1
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_0
c  in DIMACS:
 20222  20223 -20224  504 -20225 0
 20222  20223 -20224  504 -20226 0
 20222  20223 -20224  504 -20227 0

c  0-1 --> -1
c    (-b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧ -p_504) -> ( b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0)
c  in CNF:
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨  b^{126, 5}_2
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_1
c     b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨  b^{126, 5}_0
c  in DIMACS:
 20222  20223  20224  504  20225 0
 20222  20223  20224  504 -20226 0
 20222  20223  20224  504  20227 0

c  -1-1 --> -2
c    ( b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧  b^{126, 4}_0 ∧ -p_504) -> ( b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0)
c  in CNF:
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨  b^{126, 5}_2
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨  b^{126, 5}_1
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨  p_504 ∨ -b^{126, 5}_0
c  in DIMACS:
-20222  20223 -20224  504  20225 0
-20222  20223 -20224  504  20226 0
-20222  20223 -20224  504 -20227 0

c  -2-1 --> break 
c    ( b^{126, 4}_2 ∧  b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨  b^{126, 4}_0 ∨  p_504 ∨ break
c  in DIMACS:
-20222 -20223  20224  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 4}_2 ∧ -b^{126, 4}_1 ∧ -b^{126, 4}_0 ∧ true) 
c  in CNF:
c    -b^{126, 4}_2 ∨  b^{126, 4}_1 ∨  b^{126, 4}_0 ∨ false 
c  in DIMACS:
-20222  20223  20224  0

c  3 does not represent an automaton state.
c    -(-b^{126, 4}_2 ∧  b^{126, 4}_1 ∧  b^{126, 4}_0 ∧ true) 
c  in CNF:
c     b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ false 
c  in DIMACS:
 20222 -20223 -20224  0
c  -3 does not represent an automaton state.
c    -( b^{126, 4}_2 ∧  b^{126, 4}_1 ∧  b^{126, 4}_0 ∧ true) 
c  in CNF:
c    -b^{126, 4}_2 ∨ -b^{126, 4}_1 ∨ -b^{126, 4}_0 ∨ false 
c  in DIMACS:
-20222 -20223 -20224  0

c i = 5
c  -2+1 --> -1
c    ( b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧  p_630) -> ( b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0)
c  in CNF:
c    -b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨  b^{126, 6}_2
c    -b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_1
c    -b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨  b^{126, 6}_0
c  in DIMACS:
-20225 -20226  20227 -630  20228 0
-20225 -20226  20227 -630 -20229 0
-20225 -20226  20227 -630  20230 0

c  -1+1 --> 0
c    ( b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0 ∧  p_630) -> (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧ -b^{126, 6}_0)
c  in CNF:
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_2
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_1
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_0
c  in DIMACS:
-20225  20226 -20227 -630 -20228 0
-20225  20226 -20227 -630 -20229 0
-20225  20226 -20227 -630 -20230 0

c  0+1 --> 1
c    (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧  p_630) -> (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0)
c  in CNF:
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_2
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_1
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨  b^{126, 6}_0
c  in DIMACS:
 20225  20226  20227 -630 -20228 0
 20225  20226  20227 -630 -20229 0
 20225  20226  20227 -630  20230 0

c  1+1 --> 2
c    (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0 ∧  p_630) -> (-b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0)
c  in CNF:
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_2
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨  b^{126, 6}_1
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ -p_630 ∨ -b^{126, 6}_0
c  in DIMACS:
 20225  20226 -20227 -630 -20228 0
 20225  20226 -20227 -630  20229 0
 20225  20226 -20227 -630 -20230 0

c  2+1 --> break 
c    (-b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧  p_630) -> break
c  in CNF:
c     b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 20225 -20226  20227 -630 1162 0


c  2-1 --> 1
c    (-b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧ -p_630) -> (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0)
c  in CNF:
c     b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_2
c     b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_1
c     b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨  b^{126, 6}_0
c  in DIMACS:
 20225 -20226  20227  630 -20228 0
 20225 -20226  20227  630 -20229 0
 20225 -20226  20227  630  20230 0

c  1-1 --> 0
c    (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0 ∧ -p_630) -> (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧ -b^{126, 6}_0)
c  in CNF:
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_2
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_1
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_0
c  in DIMACS:
 20225  20226 -20227  630 -20228 0
 20225  20226 -20227  630 -20229 0
 20225  20226 -20227  630 -20230 0

c  0-1 --> -1
c    (-b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧ -p_630) -> ( b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0)
c  in CNF:
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨  b^{126, 6}_2
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_1
c     b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨  b^{126, 6}_0
c  in DIMACS:
 20225  20226  20227  630  20228 0
 20225  20226  20227  630 -20229 0
 20225  20226  20227  630  20230 0

c  -1-1 --> -2
c    ( b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧  b^{126, 5}_0 ∧ -p_630) -> ( b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0)
c  in CNF:
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨  b^{126, 6}_2
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨  b^{126, 6}_1
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨  p_630 ∨ -b^{126, 6}_0
c  in DIMACS:
-20225  20226 -20227  630  20228 0
-20225  20226 -20227  630  20229 0
-20225  20226 -20227  630 -20230 0

c  -2-1 --> break 
c    ( b^{126, 5}_2 ∧  b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨  b^{126, 5}_0 ∨  p_630 ∨ break
c  in DIMACS:
-20225 -20226  20227  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 5}_2 ∧ -b^{126, 5}_1 ∧ -b^{126, 5}_0 ∧ true) 
c  in CNF:
c    -b^{126, 5}_2 ∨  b^{126, 5}_1 ∨  b^{126, 5}_0 ∨ false 
c  in DIMACS:
-20225  20226  20227  0

c  3 does not represent an automaton state.
c    -(-b^{126, 5}_2 ∧  b^{126, 5}_1 ∧  b^{126, 5}_0 ∧ true) 
c  in CNF:
c     b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ false 
c  in DIMACS:
 20225 -20226 -20227  0
c  -3 does not represent an automaton state.
c    -( b^{126, 5}_2 ∧  b^{126, 5}_1 ∧  b^{126, 5}_0 ∧ true) 
c  in CNF:
c    -b^{126, 5}_2 ∨ -b^{126, 5}_1 ∨ -b^{126, 5}_0 ∨ false 
c  in DIMACS:
-20225 -20226 -20227  0

c i = 6
c  -2+1 --> -1
c    ( b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧  p_756) -> ( b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0)
c  in CNF:
c    -b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨  b^{126, 7}_2
c    -b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_1
c    -b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨  b^{126, 7}_0
c  in DIMACS:
-20228 -20229  20230 -756  20231 0
-20228 -20229  20230 -756 -20232 0
-20228 -20229  20230 -756  20233 0

c  -1+1 --> 0
c    ( b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0 ∧  p_756) -> (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧ -b^{126, 7}_0)
c  in CNF:
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_2
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_1
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_0
c  in DIMACS:
-20228  20229 -20230 -756 -20231 0
-20228  20229 -20230 -756 -20232 0
-20228  20229 -20230 -756 -20233 0

c  0+1 --> 1
c    (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧  p_756) -> (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0)
c  in CNF:
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_2
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_1
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨  b^{126, 7}_0
c  in DIMACS:
 20228  20229  20230 -756 -20231 0
 20228  20229  20230 -756 -20232 0
 20228  20229  20230 -756  20233 0

c  1+1 --> 2
c    (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0 ∧  p_756) -> (-b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0)
c  in CNF:
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_2
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨  b^{126, 7}_1
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ -p_756 ∨ -b^{126, 7}_0
c  in DIMACS:
 20228  20229 -20230 -756 -20231 0
 20228  20229 -20230 -756  20232 0
 20228  20229 -20230 -756 -20233 0

c  2+1 --> break 
c    (-b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧  p_756) -> break
c  in CNF:
c     b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 20228 -20229  20230 -756 1162 0


c  2-1 --> 1
c    (-b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧ -p_756) -> (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0)
c  in CNF:
c     b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_2
c     b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_1
c     b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨  b^{126, 7}_0
c  in DIMACS:
 20228 -20229  20230  756 -20231 0
 20228 -20229  20230  756 -20232 0
 20228 -20229  20230  756  20233 0

c  1-1 --> 0
c    (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0 ∧ -p_756) -> (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧ -b^{126, 7}_0)
c  in CNF:
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_2
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_1
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_0
c  in DIMACS:
 20228  20229 -20230  756 -20231 0
 20228  20229 -20230  756 -20232 0
 20228  20229 -20230  756 -20233 0

c  0-1 --> -1
c    (-b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧ -p_756) -> ( b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0)
c  in CNF:
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨  b^{126, 7}_2
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_1
c     b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨  b^{126, 7}_0
c  in DIMACS:
 20228  20229  20230  756  20231 0
 20228  20229  20230  756 -20232 0
 20228  20229  20230  756  20233 0

c  -1-1 --> -2
c    ( b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧  b^{126, 6}_0 ∧ -p_756) -> ( b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0)
c  in CNF:
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨  b^{126, 7}_2
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨  b^{126, 7}_1
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨  p_756 ∨ -b^{126, 7}_0
c  in DIMACS:
-20228  20229 -20230  756  20231 0
-20228  20229 -20230  756  20232 0
-20228  20229 -20230  756 -20233 0

c  -2-1 --> break 
c    ( b^{126, 6}_2 ∧  b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨  b^{126, 6}_0 ∨  p_756 ∨ break
c  in DIMACS:
-20228 -20229  20230  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 6}_2 ∧ -b^{126, 6}_1 ∧ -b^{126, 6}_0 ∧ true) 
c  in CNF:
c    -b^{126, 6}_2 ∨  b^{126, 6}_1 ∨  b^{126, 6}_0 ∨ false 
c  in DIMACS:
-20228  20229  20230  0

c  3 does not represent an automaton state.
c    -(-b^{126, 6}_2 ∧  b^{126, 6}_1 ∧  b^{126, 6}_0 ∧ true) 
c  in CNF:
c     b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ false 
c  in DIMACS:
 20228 -20229 -20230  0
c  -3 does not represent an automaton state.
c    -( b^{126, 6}_2 ∧  b^{126, 6}_1 ∧  b^{126, 6}_0 ∧ true) 
c  in CNF:
c    -b^{126, 6}_2 ∨ -b^{126, 6}_1 ∨ -b^{126, 6}_0 ∨ false 
c  in DIMACS:
-20228 -20229 -20230  0

c i = 7
c  -2+1 --> -1
c    ( b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧  p_882) -> ( b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0)
c  in CNF:
c    -b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨  b^{126, 8}_2
c    -b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_1
c    -b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨  b^{126, 8}_0
c  in DIMACS:
-20231 -20232  20233 -882  20234 0
-20231 -20232  20233 -882 -20235 0
-20231 -20232  20233 -882  20236 0

c  -1+1 --> 0
c    ( b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0 ∧  p_882) -> (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧ -b^{126, 8}_0)
c  in CNF:
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_2
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_1
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_0
c  in DIMACS:
-20231  20232 -20233 -882 -20234 0
-20231  20232 -20233 -882 -20235 0
-20231  20232 -20233 -882 -20236 0

c  0+1 --> 1
c    (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧  p_882) -> (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0)
c  in CNF:
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_2
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_1
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨  b^{126, 8}_0
c  in DIMACS:
 20231  20232  20233 -882 -20234 0
 20231  20232  20233 -882 -20235 0
 20231  20232  20233 -882  20236 0

c  1+1 --> 2
c    (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0 ∧  p_882) -> (-b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0)
c  in CNF:
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_2
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨  b^{126, 8}_1
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ -p_882 ∨ -b^{126, 8}_0
c  in DIMACS:
 20231  20232 -20233 -882 -20234 0
 20231  20232 -20233 -882  20235 0
 20231  20232 -20233 -882 -20236 0

c  2+1 --> break 
c    (-b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧  p_882) -> break
c  in CNF:
c     b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 20231 -20232  20233 -882 1162 0


c  2-1 --> 1
c    (-b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧ -p_882) -> (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0)
c  in CNF:
c     b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_2
c     b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_1
c     b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨  b^{126, 8}_0
c  in DIMACS:
 20231 -20232  20233  882 -20234 0
 20231 -20232  20233  882 -20235 0
 20231 -20232  20233  882  20236 0

c  1-1 --> 0
c    (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0 ∧ -p_882) -> (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧ -b^{126, 8}_0)
c  in CNF:
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_2
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_1
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_0
c  in DIMACS:
 20231  20232 -20233  882 -20234 0
 20231  20232 -20233  882 -20235 0
 20231  20232 -20233  882 -20236 0

c  0-1 --> -1
c    (-b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧ -p_882) -> ( b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0)
c  in CNF:
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨  b^{126, 8}_2
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_1
c     b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨  b^{126, 8}_0
c  in DIMACS:
 20231  20232  20233  882  20234 0
 20231  20232  20233  882 -20235 0
 20231  20232  20233  882  20236 0

c  -1-1 --> -2
c    ( b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧  b^{126, 7}_0 ∧ -p_882) -> ( b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0)
c  in CNF:
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨  b^{126, 8}_2
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨  b^{126, 8}_1
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨  p_882 ∨ -b^{126, 8}_0
c  in DIMACS:
-20231  20232 -20233  882  20234 0
-20231  20232 -20233  882  20235 0
-20231  20232 -20233  882 -20236 0

c  -2-1 --> break 
c    ( b^{126, 7}_2 ∧  b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨  b^{126, 7}_0 ∨  p_882 ∨ break
c  in DIMACS:
-20231 -20232  20233  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 7}_2 ∧ -b^{126, 7}_1 ∧ -b^{126, 7}_0 ∧ true) 
c  in CNF:
c    -b^{126, 7}_2 ∨  b^{126, 7}_1 ∨  b^{126, 7}_0 ∨ false 
c  in DIMACS:
-20231  20232  20233  0

c  3 does not represent an automaton state.
c    -(-b^{126, 7}_2 ∧  b^{126, 7}_1 ∧  b^{126, 7}_0 ∧ true) 
c  in CNF:
c     b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ false 
c  in DIMACS:
 20231 -20232 -20233  0
c  -3 does not represent an automaton state.
c    -( b^{126, 7}_2 ∧  b^{126, 7}_1 ∧  b^{126, 7}_0 ∧ true) 
c  in CNF:
c    -b^{126, 7}_2 ∨ -b^{126, 7}_1 ∨ -b^{126, 7}_0 ∨ false 
c  in DIMACS:
-20231 -20232 -20233  0

c i = 8
c  -2+1 --> -1
c    ( b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧  p_1008) -> ( b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0)
c  in CNF:
c    -b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨  b^{126, 9}_2
c    -b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_1
c    -b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨  b^{126, 9}_0
c  in DIMACS:
-20234 -20235  20236 -1008  20237 0
-20234 -20235  20236 -1008 -20238 0
-20234 -20235  20236 -1008  20239 0

c  -1+1 --> 0
c    ( b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0 ∧  p_1008) -> (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧ -b^{126, 9}_0)
c  in CNF:
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_2
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_1
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_0
c  in DIMACS:
-20234  20235 -20236 -1008 -20237 0
-20234  20235 -20236 -1008 -20238 0
-20234  20235 -20236 -1008 -20239 0

c  0+1 --> 1
c    (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧  p_1008) -> (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0)
c  in CNF:
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_2
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_1
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨  b^{126, 9}_0
c  in DIMACS:
 20234  20235  20236 -1008 -20237 0
 20234  20235  20236 -1008 -20238 0
 20234  20235  20236 -1008  20239 0

c  1+1 --> 2
c    (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0 ∧  p_1008) -> (-b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0)
c  in CNF:
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_2
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨  b^{126, 9}_1
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ -p_1008 ∨ -b^{126, 9}_0
c  in DIMACS:
 20234  20235 -20236 -1008 -20237 0
 20234  20235 -20236 -1008  20238 0
 20234  20235 -20236 -1008 -20239 0

c  2+1 --> break 
c    (-b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 20234 -20235  20236 -1008 1162 0


c  2-1 --> 1
c    (-b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧ -p_1008) -> (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0)
c  in CNF:
c     b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_2
c     b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_1
c     b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨  b^{126, 9}_0
c  in DIMACS:
 20234 -20235  20236  1008 -20237 0
 20234 -20235  20236  1008 -20238 0
 20234 -20235  20236  1008  20239 0

c  1-1 --> 0
c    (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0 ∧ -p_1008) -> (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧ -b^{126, 9}_0)
c  in CNF:
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_2
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_1
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_0
c  in DIMACS:
 20234  20235 -20236  1008 -20237 0
 20234  20235 -20236  1008 -20238 0
 20234  20235 -20236  1008 -20239 0

c  0-1 --> -1
c    (-b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧ -p_1008) -> ( b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0)
c  in CNF:
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨  b^{126, 9}_2
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_1
c     b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨  b^{126, 9}_0
c  in DIMACS:
 20234  20235  20236  1008  20237 0
 20234  20235  20236  1008 -20238 0
 20234  20235  20236  1008  20239 0

c  -1-1 --> -2
c    ( b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧  b^{126, 8}_0 ∧ -p_1008) -> ( b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0)
c  in CNF:
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨  b^{126, 9}_2
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨  b^{126, 9}_1
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨  p_1008 ∨ -b^{126, 9}_0
c  in DIMACS:
-20234  20235 -20236  1008  20237 0
-20234  20235 -20236  1008  20238 0
-20234  20235 -20236  1008 -20239 0

c  -2-1 --> break 
c    ( b^{126, 8}_2 ∧  b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨  b^{126, 8}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-20234 -20235  20236  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 8}_2 ∧ -b^{126, 8}_1 ∧ -b^{126, 8}_0 ∧ true) 
c  in CNF:
c    -b^{126, 8}_2 ∨  b^{126, 8}_1 ∨  b^{126, 8}_0 ∨ false 
c  in DIMACS:
-20234  20235  20236  0

c  3 does not represent an automaton state.
c    -(-b^{126, 8}_2 ∧  b^{126, 8}_1 ∧  b^{126, 8}_0 ∧ true) 
c  in CNF:
c     b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ false 
c  in DIMACS:
 20234 -20235 -20236  0
c  -3 does not represent an automaton state.
c    -( b^{126, 8}_2 ∧  b^{126, 8}_1 ∧  b^{126, 8}_0 ∧ true) 
c  in CNF:
c    -b^{126, 8}_2 ∨ -b^{126, 8}_1 ∨ -b^{126, 8}_0 ∨ false 
c  in DIMACS:
-20234 -20235 -20236  0

c i = 9
c  -2+1 --> -1
c    ( b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧  p_1134) -> ( b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧  b^{126, 10}_0)
c  in CNF:
c    -b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨  b^{126, 10}_2
c    -b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_1
c    -b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨  b^{126, 10}_0
c  in DIMACS:
-20237 -20238  20239 -1134  20240 0
-20237 -20238  20239 -1134 -20241 0
-20237 -20238  20239 -1134  20242 0

c  -1+1 --> 0
c    ( b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0 ∧  p_1134) -> (-b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧ -b^{126, 10}_0)
c  in CNF:
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_2
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_1
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_0
c  in DIMACS:
-20237  20238 -20239 -1134 -20240 0
-20237  20238 -20239 -1134 -20241 0
-20237  20238 -20239 -1134 -20242 0

c  0+1 --> 1
c    (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧  p_1134) -> (-b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧  b^{126, 10}_0)
c  in CNF:
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_2
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_1
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨  b^{126, 10}_0
c  in DIMACS:
 20237  20238  20239 -1134 -20240 0
 20237  20238  20239 -1134 -20241 0
 20237  20238  20239 -1134  20242 0

c  1+1 --> 2
c    (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0 ∧  p_1134) -> (-b^{126, 10}_2 ∧  b^{126, 10}_1 ∧ -b^{126, 10}_0)
c  in CNF:
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_2
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨  b^{126, 10}_1
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ -p_1134 ∨ -b^{126, 10}_0
c  in DIMACS:
 20237  20238 -20239 -1134 -20240 0
 20237  20238 -20239 -1134  20241 0
 20237  20238 -20239 -1134 -20242 0

c  2+1 --> break 
c    (-b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 20237 -20238  20239 -1134 1162 0


c  2-1 --> 1
c    (-b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧ -p_1134) -> (-b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧  b^{126, 10}_0)
c  in CNF:
c     b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_2
c     b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_1
c     b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨  b^{126, 10}_0
c  in DIMACS:
 20237 -20238  20239  1134 -20240 0
 20237 -20238  20239  1134 -20241 0
 20237 -20238  20239  1134  20242 0

c  1-1 --> 0
c    (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0 ∧ -p_1134) -> (-b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧ -b^{126, 10}_0)
c  in CNF:
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_2
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_1
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_0
c  in DIMACS:
 20237  20238 -20239  1134 -20240 0
 20237  20238 -20239  1134 -20241 0
 20237  20238 -20239  1134 -20242 0

c  0-1 --> -1
c    (-b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧ -p_1134) -> ( b^{126, 10}_2 ∧ -b^{126, 10}_1 ∧  b^{126, 10}_0)
c  in CNF:
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨  b^{126, 10}_2
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_1
c     b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨  b^{126, 10}_0
c  in DIMACS:
 20237  20238  20239  1134  20240 0
 20237  20238  20239  1134 -20241 0
 20237  20238  20239  1134  20242 0

c  -1-1 --> -2
c    ( b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧  b^{126, 9}_0 ∧ -p_1134) -> ( b^{126, 10}_2 ∧  b^{126, 10}_1 ∧ -b^{126, 10}_0)
c  in CNF:
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨  b^{126, 10}_2
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨  b^{126, 10}_1
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨  p_1134 ∨ -b^{126, 10}_0
c  in DIMACS:
-20237  20238 -20239  1134  20240 0
-20237  20238 -20239  1134  20241 0
-20237  20238 -20239  1134 -20242 0

c  -2-1 --> break 
c    ( b^{126, 9}_2 ∧  b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨  b^{126, 9}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-20237 -20238  20239  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{126, 9}_2 ∧ -b^{126, 9}_1 ∧ -b^{126, 9}_0 ∧ true) 
c  in CNF:
c    -b^{126, 9}_2 ∨  b^{126, 9}_1 ∨  b^{126, 9}_0 ∨ false 
c  in DIMACS:
-20237  20238  20239  0

c  3 does not represent an automaton state.
c    -(-b^{126, 9}_2 ∧  b^{126, 9}_1 ∧  b^{126, 9}_0 ∧ true) 
c  in CNF:
c     b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ false 
c  in DIMACS:
 20237 -20238 -20239  0
c  -3 does not represent an automaton state.
c    -( b^{126, 9}_2 ∧  b^{126, 9}_1 ∧  b^{126, 9}_0 ∧ true) 
c  in CNF:
c    -b^{126, 9}_2 ∨ -b^{126, 9}_1 ∨ -b^{126, 9}_0 ∨ false 
c  in DIMACS:
-20237 -20238 -20239  0

c INIT for k = 127
c    -b^{127, 1}_2
c    -b^{127, 1}_1
c    -b^{127, 1}_0
c  in DIMACS:
-20243 0
-20244 0
-20245 0

c Transitions for k = 127
c i = 1
c  -2+1 --> -1
c    ( b^{127, 1}_2 ∧  b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧  p_127) -> ( b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0)
c  in CNF:
c    -b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨  b^{127, 2}_2
c    -b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_1
c    -b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨  b^{127, 2}_0
c  in DIMACS:
-20243 -20244  20245 -127  20246 0
-20243 -20244  20245 -127 -20247 0
-20243 -20244  20245 -127  20248 0

c  -1+1 --> 0
c    ( b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧  b^{127, 1}_0 ∧  p_127) -> (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧ -b^{127, 2}_0)
c  in CNF:
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_2
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_1
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_0
c  in DIMACS:
-20243  20244 -20245 -127 -20246 0
-20243  20244 -20245 -127 -20247 0
-20243  20244 -20245 -127 -20248 0

c  0+1 --> 1
c    (-b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧  p_127) -> (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0)
c  in CNF:
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_2
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_1
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨  b^{127, 2}_0
c  in DIMACS:
 20243  20244  20245 -127 -20246 0
 20243  20244  20245 -127 -20247 0
 20243  20244  20245 -127  20248 0

c  1+1 --> 2
c    (-b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧  b^{127, 1}_0 ∧  p_127) -> (-b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0)
c  in CNF:
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_2
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨  b^{127, 2}_1
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ -p_127 ∨ -b^{127, 2}_0
c  in DIMACS:
 20243  20244 -20245 -127 -20246 0
 20243  20244 -20245 -127  20247 0
 20243  20244 -20245 -127 -20248 0

c  2+1 --> break 
c    (-b^{127, 1}_2 ∧  b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧  p_127) -> break
c  in CNF:
c     b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ -p_127 ∨ break
c  in DIMACS:
 20243 -20244  20245 -127 1162 0


c  2-1 --> 1
c    (-b^{127, 1}_2 ∧  b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧ -p_127) -> (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0)
c  in CNF:
c     b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_2
c     b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_1
c     b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨  b^{127, 2}_0
c  in DIMACS:
 20243 -20244  20245  127 -20246 0
 20243 -20244  20245  127 -20247 0
 20243 -20244  20245  127  20248 0

c  1-1 --> 0
c    (-b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧  b^{127, 1}_0 ∧ -p_127) -> (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧ -b^{127, 2}_0)
c  in CNF:
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_2
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_1
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_0
c  in DIMACS:
 20243  20244 -20245  127 -20246 0
 20243  20244 -20245  127 -20247 0
 20243  20244 -20245  127 -20248 0

c  0-1 --> -1
c    (-b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧ -p_127) -> ( b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0)
c  in CNF:
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨  b^{127, 2}_2
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_1
c     b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨  b^{127, 2}_0
c  in DIMACS:
 20243  20244  20245  127  20246 0
 20243  20244  20245  127 -20247 0
 20243  20244  20245  127  20248 0

c  -1-1 --> -2
c    ( b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧  b^{127, 1}_0 ∧ -p_127) -> ( b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0)
c  in CNF:
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨  b^{127, 2}_2
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨  b^{127, 2}_1
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨  p_127 ∨ -b^{127, 2}_0
c  in DIMACS:
-20243  20244 -20245  127  20246 0
-20243  20244 -20245  127  20247 0
-20243  20244 -20245  127 -20248 0

c  -2-1 --> break 
c    ( b^{127, 1}_2 ∧  b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧ -p_127) -> break
c  in CNF:
c    -b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨  b^{127, 1}_0 ∨  p_127 ∨ break
c  in DIMACS:
-20243 -20244  20245  127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 1}_2 ∧ -b^{127, 1}_1 ∧ -b^{127, 1}_0 ∧ true) 
c  in CNF:
c    -b^{127, 1}_2 ∨  b^{127, 1}_1 ∨  b^{127, 1}_0 ∨ false 
c  in DIMACS:
-20243  20244  20245  0

c  3 does not represent an automaton state.
c    -(-b^{127, 1}_2 ∧  b^{127, 1}_1 ∧  b^{127, 1}_0 ∧ true) 
c  in CNF:
c     b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ false 
c  in DIMACS:
 20243 -20244 -20245  0
c  -3 does not represent an automaton state.
c    -( b^{127, 1}_2 ∧  b^{127, 1}_1 ∧  b^{127, 1}_0 ∧ true) 
c  in CNF:
c    -b^{127, 1}_2 ∨ -b^{127, 1}_1 ∨ -b^{127, 1}_0 ∨ false 
c  in DIMACS:
-20243 -20244 -20245  0

c i = 2
c  -2+1 --> -1
c    ( b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧  p_254) -> ( b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0)
c  in CNF:
c    -b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨  b^{127, 3}_2
c    -b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_1
c    -b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨  b^{127, 3}_0
c  in DIMACS:
-20246 -20247  20248 -254  20249 0
-20246 -20247  20248 -254 -20250 0
-20246 -20247  20248 -254  20251 0

c  -1+1 --> 0
c    ( b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0 ∧  p_254) -> (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧ -b^{127, 3}_0)
c  in CNF:
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_2
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_1
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_0
c  in DIMACS:
-20246  20247 -20248 -254 -20249 0
-20246  20247 -20248 -254 -20250 0
-20246  20247 -20248 -254 -20251 0

c  0+1 --> 1
c    (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧  p_254) -> (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0)
c  in CNF:
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_2
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_1
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨  b^{127, 3}_0
c  in DIMACS:
 20246  20247  20248 -254 -20249 0
 20246  20247  20248 -254 -20250 0
 20246  20247  20248 -254  20251 0

c  1+1 --> 2
c    (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0 ∧  p_254) -> (-b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0)
c  in CNF:
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_2
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨  b^{127, 3}_1
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ -p_254 ∨ -b^{127, 3}_0
c  in DIMACS:
 20246  20247 -20248 -254 -20249 0
 20246  20247 -20248 -254  20250 0
 20246  20247 -20248 -254 -20251 0

c  2+1 --> break 
c    (-b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧  p_254) -> break
c  in CNF:
c     b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ -p_254 ∨ break
c  in DIMACS:
 20246 -20247  20248 -254 1162 0


c  2-1 --> 1
c    (-b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧ -p_254) -> (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0)
c  in CNF:
c     b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_2
c     b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_1
c     b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨  b^{127, 3}_0
c  in DIMACS:
 20246 -20247  20248  254 -20249 0
 20246 -20247  20248  254 -20250 0
 20246 -20247  20248  254  20251 0

c  1-1 --> 0
c    (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0 ∧ -p_254) -> (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧ -b^{127, 3}_0)
c  in CNF:
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_2
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_1
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_0
c  in DIMACS:
 20246  20247 -20248  254 -20249 0
 20246  20247 -20248  254 -20250 0
 20246  20247 -20248  254 -20251 0

c  0-1 --> -1
c    (-b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧ -p_254) -> ( b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0)
c  in CNF:
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨  b^{127, 3}_2
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_1
c     b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨  b^{127, 3}_0
c  in DIMACS:
 20246  20247  20248  254  20249 0
 20246  20247  20248  254 -20250 0
 20246  20247  20248  254  20251 0

c  -1-1 --> -2
c    ( b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧  b^{127, 2}_0 ∧ -p_254) -> ( b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0)
c  in CNF:
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨  b^{127, 3}_2
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨  b^{127, 3}_1
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨  p_254 ∨ -b^{127, 3}_0
c  in DIMACS:
-20246  20247 -20248  254  20249 0
-20246  20247 -20248  254  20250 0
-20246  20247 -20248  254 -20251 0

c  -2-1 --> break 
c    ( b^{127, 2}_2 ∧  b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧ -p_254) -> break
c  in CNF:
c    -b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨  b^{127, 2}_0 ∨  p_254 ∨ break
c  in DIMACS:
-20246 -20247  20248  254 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 2}_2 ∧ -b^{127, 2}_1 ∧ -b^{127, 2}_0 ∧ true) 
c  in CNF:
c    -b^{127, 2}_2 ∨  b^{127, 2}_1 ∨  b^{127, 2}_0 ∨ false 
c  in DIMACS:
-20246  20247  20248  0

c  3 does not represent an automaton state.
c    -(-b^{127, 2}_2 ∧  b^{127, 2}_1 ∧  b^{127, 2}_0 ∧ true) 
c  in CNF:
c     b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ false 
c  in DIMACS:
 20246 -20247 -20248  0
c  -3 does not represent an automaton state.
c    -( b^{127, 2}_2 ∧  b^{127, 2}_1 ∧  b^{127, 2}_0 ∧ true) 
c  in CNF:
c    -b^{127, 2}_2 ∨ -b^{127, 2}_1 ∨ -b^{127, 2}_0 ∨ false 
c  in DIMACS:
-20246 -20247 -20248  0

c i = 3
c  -2+1 --> -1
c    ( b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧  p_381) -> ( b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0)
c  in CNF:
c    -b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨  b^{127, 4}_2
c    -b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_1
c    -b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨  b^{127, 4}_0
c  in DIMACS:
-20249 -20250  20251 -381  20252 0
-20249 -20250  20251 -381 -20253 0
-20249 -20250  20251 -381  20254 0

c  -1+1 --> 0
c    ( b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0 ∧  p_381) -> (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧ -b^{127, 4}_0)
c  in CNF:
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_2
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_1
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_0
c  in DIMACS:
-20249  20250 -20251 -381 -20252 0
-20249  20250 -20251 -381 -20253 0
-20249  20250 -20251 -381 -20254 0

c  0+1 --> 1
c    (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧  p_381) -> (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0)
c  in CNF:
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_2
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_1
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨  b^{127, 4}_0
c  in DIMACS:
 20249  20250  20251 -381 -20252 0
 20249  20250  20251 -381 -20253 0
 20249  20250  20251 -381  20254 0

c  1+1 --> 2
c    (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0 ∧  p_381) -> (-b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0)
c  in CNF:
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_2
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨  b^{127, 4}_1
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ -p_381 ∨ -b^{127, 4}_0
c  in DIMACS:
 20249  20250 -20251 -381 -20252 0
 20249  20250 -20251 -381  20253 0
 20249  20250 -20251 -381 -20254 0

c  2+1 --> break 
c    (-b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧  p_381) -> break
c  in CNF:
c     b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ -p_381 ∨ break
c  in DIMACS:
 20249 -20250  20251 -381 1162 0


c  2-1 --> 1
c    (-b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧ -p_381) -> (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0)
c  in CNF:
c     b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_2
c     b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_1
c     b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨  b^{127, 4}_0
c  in DIMACS:
 20249 -20250  20251  381 -20252 0
 20249 -20250  20251  381 -20253 0
 20249 -20250  20251  381  20254 0

c  1-1 --> 0
c    (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0 ∧ -p_381) -> (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧ -b^{127, 4}_0)
c  in CNF:
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_2
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_1
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_0
c  in DIMACS:
 20249  20250 -20251  381 -20252 0
 20249  20250 -20251  381 -20253 0
 20249  20250 -20251  381 -20254 0

c  0-1 --> -1
c    (-b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧ -p_381) -> ( b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0)
c  in CNF:
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨  b^{127, 4}_2
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_1
c     b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨  b^{127, 4}_0
c  in DIMACS:
 20249  20250  20251  381  20252 0
 20249  20250  20251  381 -20253 0
 20249  20250  20251  381  20254 0

c  -1-1 --> -2
c    ( b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧  b^{127, 3}_0 ∧ -p_381) -> ( b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0)
c  in CNF:
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨  b^{127, 4}_2
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨  b^{127, 4}_1
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨  p_381 ∨ -b^{127, 4}_0
c  in DIMACS:
-20249  20250 -20251  381  20252 0
-20249  20250 -20251  381  20253 0
-20249  20250 -20251  381 -20254 0

c  -2-1 --> break 
c    ( b^{127, 3}_2 ∧  b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧ -p_381) -> break
c  in CNF:
c    -b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨  b^{127, 3}_0 ∨  p_381 ∨ break
c  in DIMACS:
-20249 -20250  20251  381 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 3}_2 ∧ -b^{127, 3}_1 ∧ -b^{127, 3}_0 ∧ true) 
c  in CNF:
c    -b^{127, 3}_2 ∨  b^{127, 3}_1 ∨  b^{127, 3}_0 ∨ false 
c  in DIMACS:
-20249  20250  20251  0

c  3 does not represent an automaton state.
c    -(-b^{127, 3}_2 ∧  b^{127, 3}_1 ∧  b^{127, 3}_0 ∧ true) 
c  in CNF:
c     b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ false 
c  in DIMACS:
 20249 -20250 -20251  0
c  -3 does not represent an automaton state.
c    -( b^{127, 3}_2 ∧  b^{127, 3}_1 ∧  b^{127, 3}_0 ∧ true) 
c  in CNF:
c    -b^{127, 3}_2 ∨ -b^{127, 3}_1 ∨ -b^{127, 3}_0 ∨ false 
c  in DIMACS:
-20249 -20250 -20251  0

c i = 4
c  -2+1 --> -1
c    ( b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧  p_508) -> ( b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0)
c  in CNF:
c    -b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨  b^{127, 5}_2
c    -b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_1
c    -b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨  b^{127, 5}_0
c  in DIMACS:
-20252 -20253  20254 -508  20255 0
-20252 -20253  20254 -508 -20256 0
-20252 -20253  20254 -508  20257 0

c  -1+1 --> 0
c    ( b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0 ∧  p_508) -> (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧ -b^{127, 5}_0)
c  in CNF:
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_2
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_1
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_0
c  in DIMACS:
-20252  20253 -20254 -508 -20255 0
-20252  20253 -20254 -508 -20256 0
-20252  20253 -20254 -508 -20257 0

c  0+1 --> 1
c    (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧  p_508) -> (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0)
c  in CNF:
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_2
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_1
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨  b^{127, 5}_0
c  in DIMACS:
 20252  20253  20254 -508 -20255 0
 20252  20253  20254 -508 -20256 0
 20252  20253  20254 -508  20257 0

c  1+1 --> 2
c    (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0 ∧  p_508) -> (-b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0)
c  in CNF:
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_2
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨  b^{127, 5}_1
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ -p_508 ∨ -b^{127, 5}_0
c  in DIMACS:
 20252  20253 -20254 -508 -20255 0
 20252  20253 -20254 -508  20256 0
 20252  20253 -20254 -508 -20257 0

c  2+1 --> break 
c    (-b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧  p_508) -> break
c  in CNF:
c     b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ -p_508 ∨ break
c  in DIMACS:
 20252 -20253  20254 -508 1162 0


c  2-1 --> 1
c    (-b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧ -p_508) -> (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0)
c  in CNF:
c     b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_2
c     b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_1
c     b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨  b^{127, 5}_0
c  in DIMACS:
 20252 -20253  20254  508 -20255 0
 20252 -20253  20254  508 -20256 0
 20252 -20253  20254  508  20257 0

c  1-1 --> 0
c    (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0 ∧ -p_508) -> (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧ -b^{127, 5}_0)
c  in CNF:
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_2
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_1
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_0
c  in DIMACS:
 20252  20253 -20254  508 -20255 0
 20252  20253 -20254  508 -20256 0
 20252  20253 -20254  508 -20257 0

c  0-1 --> -1
c    (-b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧ -p_508) -> ( b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0)
c  in CNF:
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨  b^{127, 5}_2
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_1
c     b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨  b^{127, 5}_0
c  in DIMACS:
 20252  20253  20254  508  20255 0
 20252  20253  20254  508 -20256 0
 20252  20253  20254  508  20257 0

c  -1-1 --> -2
c    ( b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧  b^{127, 4}_0 ∧ -p_508) -> ( b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0)
c  in CNF:
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨  b^{127, 5}_2
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨  b^{127, 5}_1
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨  p_508 ∨ -b^{127, 5}_0
c  in DIMACS:
-20252  20253 -20254  508  20255 0
-20252  20253 -20254  508  20256 0
-20252  20253 -20254  508 -20257 0

c  -2-1 --> break 
c    ( b^{127, 4}_2 ∧  b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧ -p_508) -> break
c  in CNF:
c    -b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨  b^{127, 4}_0 ∨  p_508 ∨ break
c  in DIMACS:
-20252 -20253  20254  508 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 4}_2 ∧ -b^{127, 4}_1 ∧ -b^{127, 4}_0 ∧ true) 
c  in CNF:
c    -b^{127, 4}_2 ∨  b^{127, 4}_1 ∨  b^{127, 4}_0 ∨ false 
c  in DIMACS:
-20252  20253  20254  0

c  3 does not represent an automaton state.
c    -(-b^{127, 4}_2 ∧  b^{127, 4}_1 ∧  b^{127, 4}_0 ∧ true) 
c  in CNF:
c     b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ false 
c  in DIMACS:
 20252 -20253 -20254  0
c  -3 does not represent an automaton state.
c    -( b^{127, 4}_2 ∧  b^{127, 4}_1 ∧  b^{127, 4}_0 ∧ true) 
c  in CNF:
c    -b^{127, 4}_2 ∨ -b^{127, 4}_1 ∨ -b^{127, 4}_0 ∨ false 
c  in DIMACS:
-20252 -20253 -20254  0

c i = 5
c  -2+1 --> -1
c    ( b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧  p_635) -> ( b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0)
c  in CNF:
c    -b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨  b^{127, 6}_2
c    -b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_1
c    -b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨  b^{127, 6}_0
c  in DIMACS:
-20255 -20256  20257 -635  20258 0
-20255 -20256  20257 -635 -20259 0
-20255 -20256  20257 -635  20260 0

c  -1+1 --> 0
c    ( b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0 ∧  p_635) -> (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧ -b^{127, 6}_0)
c  in CNF:
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_2
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_1
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_0
c  in DIMACS:
-20255  20256 -20257 -635 -20258 0
-20255  20256 -20257 -635 -20259 0
-20255  20256 -20257 -635 -20260 0

c  0+1 --> 1
c    (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧  p_635) -> (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0)
c  in CNF:
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_2
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_1
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨  b^{127, 6}_0
c  in DIMACS:
 20255  20256  20257 -635 -20258 0
 20255  20256  20257 -635 -20259 0
 20255  20256  20257 -635  20260 0

c  1+1 --> 2
c    (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0 ∧  p_635) -> (-b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0)
c  in CNF:
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_2
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨  b^{127, 6}_1
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ -p_635 ∨ -b^{127, 6}_0
c  in DIMACS:
 20255  20256 -20257 -635 -20258 0
 20255  20256 -20257 -635  20259 0
 20255  20256 -20257 -635 -20260 0

c  2+1 --> break 
c    (-b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧  p_635) -> break
c  in CNF:
c     b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ -p_635 ∨ break
c  in DIMACS:
 20255 -20256  20257 -635 1162 0


c  2-1 --> 1
c    (-b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧ -p_635) -> (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0)
c  in CNF:
c     b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_2
c     b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_1
c     b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨  b^{127, 6}_0
c  in DIMACS:
 20255 -20256  20257  635 -20258 0
 20255 -20256  20257  635 -20259 0
 20255 -20256  20257  635  20260 0

c  1-1 --> 0
c    (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0 ∧ -p_635) -> (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧ -b^{127, 6}_0)
c  in CNF:
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_2
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_1
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_0
c  in DIMACS:
 20255  20256 -20257  635 -20258 0
 20255  20256 -20257  635 -20259 0
 20255  20256 -20257  635 -20260 0

c  0-1 --> -1
c    (-b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧ -p_635) -> ( b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0)
c  in CNF:
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨  b^{127, 6}_2
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_1
c     b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨  b^{127, 6}_0
c  in DIMACS:
 20255  20256  20257  635  20258 0
 20255  20256  20257  635 -20259 0
 20255  20256  20257  635  20260 0

c  -1-1 --> -2
c    ( b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧  b^{127, 5}_0 ∧ -p_635) -> ( b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0)
c  in CNF:
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨  b^{127, 6}_2
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨  b^{127, 6}_1
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨  p_635 ∨ -b^{127, 6}_0
c  in DIMACS:
-20255  20256 -20257  635  20258 0
-20255  20256 -20257  635  20259 0
-20255  20256 -20257  635 -20260 0

c  -2-1 --> break 
c    ( b^{127, 5}_2 ∧  b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧ -p_635) -> break
c  in CNF:
c    -b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨  b^{127, 5}_0 ∨  p_635 ∨ break
c  in DIMACS:
-20255 -20256  20257  635 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 5}_2 ∧ -b^{127, 5}_1 ∧ -b^{127, 5}_0 ∧ true) 
c  in CNF:
c    -b^{127, 5}_2 ∨  b^{127, 5}_1 ∨  b^{127, 5}_0 ∨ false 
c  in DIMACS:
-20255  20256  20257  0

c  3 does not represent an automaton state.
c    -(-b^{127, 5}_2 ∧  b^{127, 5}_1 ∧  b^{127, 5}_0 ∧ true) 
c  in CNF:
c     b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ false 
c  in DIMACS:
 20255 -20256 -20257  0
c  -3 does not represent an automaton state.
c    -( b^{127, 5}_2 ∧  b^{127, 5}_1 ∧  b^{127, 5}_0 ∧ true) 
c  in CNF:
c    -b^{127, 5}_2 ∨ -b^{127, 5}_1 ∨ -b^{127, 5}_0 ∨ false 
c  in DIMACS:
-20255 -20256 -20257  0

c i = 6
c  -2+1 --> -1
c    ( b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧  p_762) -> ( b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0)
c  in CNF:
c    -b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨  b^{127, 7}_2
c    -b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_1
c    -b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨  b^{127, 7}_0
c  in DIMACS:
-20258 -20259  20260 -762  20261 0
-20258 -20259  20260 -762 -20262 0
-20258 -20259  20260 -762  20263 0

c  -1+1 --> 0
c    ( b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0 ∧  p_762) -> (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧ -b^{127, 7}_0)
c  in CNF:
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_2
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_1
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_0
c  in DIMACS:
-20258  20259 -20260 -762 -20261 0
-20258  20259 -20260 -762 -20262 0
-20258  20259 -20260 -762 -20263 0

c  0+1 --> 1
c    (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧  p_762) -> (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0)
c  in CNF:
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_2
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_1
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨  b^{127, 7}_0
c  in DIMACS:
 20258  20259  20260 -762 -20261 0
 20258  20259  20260 -762 -20262 0
 20258  20259  20260 -762  20263 0

c  1+1 --> 2
c    (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0 ∧  p_762) -> (-b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0)
c  in CNF:
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_2
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨  b^{127, 7}_1
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ -p_762 ∨ -b^{127, 7}_0
c  in DIMACS:
 20258  20259 -20260 -762 -20261 0
 20258  20259 -20260 -762  20262 0
 20258  20259 -20260 -762 -20263 0

c  2+1 --> break 
c    (-b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧  p_762) -> break
c  in CNF:
c     b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 20258 -20259  20260 -762 1162 0


c  2-1 --> 1
c    (-b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧ -p_762) -> (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0)
c  in CNF:
c     b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_2
c     b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_1
c     b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨  b^{127, 7}_0
c  in DIMACS:
 20258 -20259  20260  762 -20261 0
 20258 -20259  20260  762 -20262 0
 20258 -20259  20260  762  20263 0

c  1-1 --> 0
c    (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0 ∧ -p_762) -> (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧ -b^{127, 7}_0)
c  in CNF:
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_2
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_1
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_0
c  in DIMACS:
 20258  20259 -20260  762 -20261 0
 20258  20259 -20260  762 -20262 0
 20258  20259 -20260  762 -20263 0

c  0-1 --> -1
c    (-b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧ -p_762) -> ( b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0)
c  in CNF:
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨  b^{127, 7}_2
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_1
c     b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨  b^{127, 7}_0
c  in DIMACS:
 20258  20259  20260  762  20261 0
 20258  20259  20260  762 -20262 0
 20258  20259  20260  762  20263 0

c  -1-1 --> -2
c    ( b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧  b^{127, 6}_0 ∧ -p_762) -> ( b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0)
c  in CNF:
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨  b^{127, 7}_2
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨  b^{127, 7}_1
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨  p_762 ∨ -b^{127, 7}_0
c  in DIMACS:
-20258  20259 -20260  762  20261 0
-20258  20259 -20260  762  20262 0
-20258  20259 -20260  762 -20263 0

c  -2-1 --> break 
c    ( b^{127, 6}_2 ∧  b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨  b^{127, 6}_0 ∨  p_762 ∨ break
c  in DIMACS:
-20258 -20259  20260  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 6}_2 ∧ -b^{127, 6}_1 ∧ -b^{127, 6}_0 ∧ true) 
c  in CNF:
c    -b^{127, 6}_2 ∨  b^{127, 6}_1 ∨  b^{127, 6}_0 ∨ false 
c  in DIMACS:
-20258  20259  20260  0

c  3 does not represent an automaton state.
c    -(-b^{127, 6}_2 ∧  b^{127, 6}_1 ∧  b^{127, 6}_0 ∧ true) 
c  in CNF:
c     b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ false 
c  in DIMACS:
 20258 -20259 -20260  0
c  -3 does not represent an automaton state.
c    -( b^{127, 6}_2 ∧  b^{127, 6}_1 ∧  b^{127, 6}_0 ∧ true) 
c  in CNF:
c    -b^{127, 6}_2 ∨ -b^{127, 6}_1 ∨ -b^{127, 6}_0 ∨ false 
c  in DIMACS:
-20258 -20259 -20260  0

c i = 7
c  -2+1 --> -1
c    ( b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧  p_889) -> ( b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0)
c  in CNF:
c    -b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨  b^{127, 8}_2
c    -b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_1
c    -b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨  b^{127, 8}_0
c  in DIMACS:
-20261 -20262  20263 -889  20264 0
-20261 -20262  20263 -889 -20265 0
-20261 -20262  20263 -889  20266 0

c  -1+1 --> 0
c    ( b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0 ∧  p_889) -> (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧ -b^{127, 8}_0)
c  in CNF:
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_2
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_1
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_0
c  in DIMACS:
-20261  20262 -20263 -889 -20264 0
-20261  20262 -20263 -889 -20265 0
-20261  20262 -20263 -889 -20266 0

c  0+1 --> 1
c    (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧  p_889) -> (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0)
c  in CNF:
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_2
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_1
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨  b^{127, 8}_0
c  in DIMACS:
 20261  20262  20263 -889 -20264 0
 20261  20262  20263 -889 -20265 0
 20261  20262  20263 -889  20266 0

c  1+1 --> 2
c    (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0 ∧  p_889) -> (-b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0)
c  in CNF:
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_2
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨  b^{127, 8}_1
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ -p_889 ∨ -b^{127, 8}_0
c  in DIMACS:
 20261  20262 -20263 -889 -20264 0
 20261  20262 -20263 -889  20265 0
 20261  20262 -20263 -889 -20266 0

c  2+1 --> break 
c    (-b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧  p_889) -> break
c  in CNF:
c     b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ -p_889 ∨ break
c  in DIMACS:
 20261 -20262  20263 -889 1162 0


c  2-1 --> 1
c    (-b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧ -p_889) -> (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0)
c  in CNF:
c     b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_2
c     b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_1
c     b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨  b^{127, 8}_0
c  in DIMACS:
 20261 -20262  20263  889 -20264 0
 20261 -20262  20263  889 -20265 0
 20261 -20262  20263  889  20266 0

c  1-1 --> 0
c    (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0 ∧ -p_889) -> (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧ -b^{127, 8}_0)
c  in CNF:
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_2
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_1
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_0
c  in DIMACS:
 20261  20262 -20263  889 -20264 0
 20261  20262 -20263  889 -20265 0
 20261  20262 -20263  889 -20266 0

c  0-1 --> -1
c    (-b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧ -p_889) -> ( b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0)
c  in CNF:
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨  b^{127, 8}_2
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_1
c     b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨  b^{127, 8}_0
c  in DIMACS:
 20261  20262  20263  889  20264 0
 20261  20262  20263  889 -20265 0
 20261  20262  20263  889  20266 0

c  -1-1 --> -2
c    ( b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧  b^{127, 7}_0 ∧ -p_889) -> ( b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0)
c  in CNF:
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨  b^{127, 8}_2
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨  b^{127, 8}_1
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨  p_889 ∨ -b^{127, 8}_0
c  in DIMACS:
-20261  20262 -20263  889  20264 0
-20261  20262 -20263  889  20265 0
-20261  20262 -20263  889 -20266 0

c  -2-1 --> break 
c    ( b^{127, 7}_2 ∧  b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧ -p_889) -> break
c  in CNF:
c    -b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨  b^{127, 7}_0 ∨  p_889 ∨ break
c  in DIMACS:
-20261 -20262  20263  889 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 7}_2 ∧ -b^{127, 7}_1 ∧ -b^{127, 7}_0 ∧ true) 
c  in CNF:
c    -b^{127, 7}_2 ∨  b^{127, 7}_1 ∨  b^{127, 7}_0 ∨ false 
c  in DIMACS:
-20261  20262  20263  0

c  3 does not represent an automaton state.
c    -(-b^{127, 7}_2 ∧  b^{127, 7}_1 ∧  b^{127, 7}_0 ∧ true) 
c  in CNF:
c     b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ false 
c  in DIMACS:
 20261 -20262 -20263  0
c  -3 does not represent an automaton state.
c    -( b^{127, 7}_2 ∧  b^{127, 7}_1 ∧  b^{127, 7}_0 ∧ true) 
c  in CNF:
c    -b^{127, 7}_2 ∨ -b^{127, 7}_1 ∨ -b^{127, 7}_0 ∨ false 
c  in DIMACS:
-20261 -20262 -20263  0

c i = 8
c  -2+1 --> -1
c    ( b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧  p_1016) -> ( b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0)
c  in CNF:
c    -b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨  b^{127, 9}_2
c    -b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_1
c    -b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨  b^{127, 9}_0
c  in DIMACS:
-20264 -20265  20266 -1016  20267 0
-20264 -20265  20266 -1016 -20268 0
-20264 -20265  20266 -1016  20269 0

c  -1+1 --> 0
c    ( b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0 ∧  p_1016) -> (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧ -b^{127, 9}_0)
c  in CNF:
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_2
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_1
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_0
c  in DIMACS:
-20264  20265 -20266 -1016 -20267 0
-20264  20265 -20266 -1016 -20268 0
-20264  20265 -20266 -1016 -20269 0

c  0+1 --> 1
c    (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧  p_1016) -> (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0)
c  in CNF:
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_2
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_1
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨  b^{127, 9}_0
c  in DIMACS:
 20264  20265  20266 -1016 -20267 0
 20264  20265  20266 -1016 -20268 0
 20264  20265  20266 -1016  20269 0

c  1+1 --> 2
c    (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0 ∧  p_1016) -> (-b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0)
c  in CNF:
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_2
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨  b^{127, 9}_1
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ -p_1016 ∨ -b^{127, 9}_0
c  in DIMACS:
 20264  20265 -20266 -1016 -20267 0
 20264  20265 -20266 -1016  20268 0
 20264  20265 -20266 -1016 -20269 0

c  2+1 --> break 
c    (-b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 20264 -20265  20266 -1016 1162 0


c  2-1 --> 1
c    (-b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧ -p_1016) -> (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0)
c  in CNF:
c     b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_2
c     b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_1
c     b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨  b^{127, 9}_0
c  in DIMACS:
 20264 -20265  20266  1016 -20267 0
 20264 -20265  20266  1016 -20268 0
 20264 -20265  20266  1016  20269 0

c  1-1 --> 0
c    (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0 ∧ -p_1016) -> (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧ -b^{127, 9}_0)
c  in CNF:
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_2
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_1
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_0
c  in DIMACS:
 20264  20265 -20266  1016 -20267 0
 20264  20265 -20266  1016 -20268 0
 20264  20265 -20266  1016 -20269 0

c  0-1 --> -1
c    (-b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧ -p_1016) -> ( b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0)
c  in CNF:
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨  b^{127, 9}_2
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_1
c     b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨  b^{127, 9}_0
c  in DIMACS:
 20264  20265  20266  1016  20267 0
 20264  20265  20266  1016 -20268 0
 20264  20265  20266  1016  20269 0

c  -1-1 --> -2
c    ( b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧  b^{127, 8}_0 ∧ -p_1016) -> ( b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0)
c  in CNF:
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨  b^{127, 9}_2
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨  b^{127, 9}_1
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨  p_1016 ∨ -b^{127, 9}_0
c  in DIMACS:
-20264  20265 -20266  1016  20267 0
-20264  20265 -20266  1016  20268 0
-20264  20265 -20266  1016 -20269 0

c  -2-1 --> break 
c    ( b^{127, 8}_2 ∧  b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨  b^{127, 8}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-20264 -20265  20266  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 8}_2 ∧ -b^{127, 8}_1 ∧ -b^{127, 8}_0 ∧ true) 
c  in CNF:
c    -b^{127, 8}_2 ∨  b^{127, 8}_1 ∨  b^{127, 8}_0 ∨ false 
c  in DIMACS:
-20264  20265  20266  0

c  3 does not represent an automaton state.
c    -(-b^{127, 8}_2 ∧  b^{127, 8}_1 ∧  b^{127, 8}_0 ∧ true) 
c  in CNF:
c     b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ false 
c  in DIMACS:
 20264 -20265 -20266  0
c  -3 does not represent an automaton state.
c    -( b^{127, 8}_2 ∧  b^{127, 8}_1 ∧  b^{127, 8}_0 ∧ true) 
c  in CNF:
c    -b^{127, 8}_2 ∨ -b^{127, 8}_1 ∨ -b^{127, 8}_0 ∨ false 
c  in DIMACS:
-20264 -20265 -20266  0

c i = 9
c  -2+1 --> -1
c    ( b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧  p_1143) -> ( b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧  b^{127, 10}_0)
c  in CNF:
c    -b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨  b^{127, 10}_2
c    -b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_1
c    -b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨  b^{127, 10}_0
c  in DIMACS:
-20267 -20268  20269 -1143  20270 0
-20267 -20268  20269 -1143 -20271 0
-20267 -20268  20269 -1143  20272 0

c  -1+1 --> 0
c    ( b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0 ∧  p_1143) -> (-b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧ -b^{127, 10}_0)
c  in CNF:
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_2
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_1
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_0
c  in DIMACS:
-20267  20268 -20269 -1143 -20270 0
-20267  20268 -20269 -1143 -20271 0
-20267  20268 -20269 -1143 -20272 0

c  0+1 --> 1
c    (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧  p_1143) -> (-b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧  b^{127, 10}_0)
c  in CNF:
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_2
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_1
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨  b^{127, 10}_0
c  in DIMACS:
 20267  20268  20269 -1143 -20270 0
 20267  20268  20269 -1143 -20271 0
 20267  20268  20269 -1143  20272 0

c  1+1 --> 2
c    (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0 ∧  p_1143) -> (-b^{127, 10}_2 ∧  b^{127, 10}_1 ∧ -b^{127, 10}_0)
c  in CNF:
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_2
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨  b^{127, 10}_1
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ -p_1143 ∨ -b^{127, 10}_0
c  in DIMACS:
 20267  20268 -20269 -1143 -20270 0
 20267  20268 -20269 -1143  20271 0
 20267  20268 -20269 -1143 -20272 0

c  2+1 --> break 
c    (-b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧  p_1143) -> break
c  in CNF:
c     b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ -p_1143 ∨ break
c  in DIMACS:
 20267 -20268  20269 -1143 1162 0


c  2-1 --> 1
c    (-b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧ -p_1143) -> (-b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧  b^{127, 10}_0)
c  in CNF:
c     b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_2
c     b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_1
c     b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨  b^{127, 10}_0
c  in DIMACS:
 20267 -20268  20269  1143 -20270 0
 20267 -20268  20269  1143 -20271 0
 20267 -20268  20269  1143  20272 0

c  1-1 --> 0
c    (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0 ∧ -p_1143) -> (-b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧ -b^{127, 10}_0)
c  in CNF:
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_2
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_1
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_0
c  in DIMACS:
 20267  20268 -20269  1143 -20270 0
 20267  20268 -20269  1143 -20271 0
 20267  20268 -20269  1143 -20272 0

c  0-1 --> -1
c    (-b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧ -p_1143) -> ( b^{127, 10}_2 ∧ -b^{127, 10}_1 ∧  b^{127, 10}_0)
c  in CNF:
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨  b^{127, 10}_2
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_1
c     b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨  b^{127, 10}_0
c  in DIMACS:
 20267  20268  20269  1143  20270 0
 20267  20268  20269  1143 -20271 0
 20267  20268  20269  1143  20272 0

c  -1-1 --> -2
c    ( b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧  b^{127, 9}_0 ∧ -p_1143) -> ( b^{127, 10}_2 ∧  b^{127, 10}_1 ∧ -b^{127, 10}_0)
c  in CNF:
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨  b^{127, 10}_2
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨  b^{127, 10}_1
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨  p_1143 ∨ -b^{127, 10}_0
c  in DIMACS:
-20267  20268 -20269  1143  20270 0
-20267  20268 -20269  1143  20271 0
-20267  20268 -20269  1143 -20272 0

c  -2-1 --> break 
c    ( b^{127, 9}_2 ∧  b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧ -p_1143) -> break
c  in CNF:
c    -b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨  b^{127, 9}_0 ∨  p_1143 ∨ break
c  in DIMACS:
-20267 -20268  20269  1143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{127, 9}_2 ∧ -b^{127, 9}_1 ∧ -b^{127, 9}_0 ∧ true) 
c  in CNF:
c    -b^{127, 9}_2 ∨  b^{127, 9}_1 ∨  b^{127, 9}_0 ∨ false 
c  in DIMACS:
-20267  20268  20269  0

c  3 does not represent an automaton state.
c    -(-b^{127, 9}_2 ∧  b^{127, 9}_1 ∧  b^{127, 9}_0 ∧ true) 
c  in CNF:
c     b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ false 
c  in DIMACS:
 20267 -20268 -20269  0
c  -3 does not represent an automaton state.
c    -( b^{127, 9}_2 ∧  b^{127, 9}_1 ∧  b^{127, 9}_0 ∧ true) 
c  in CNF:
c    -b^{127, 9}_2 ∨ -b^{127, 9}_1 ∨ -b^{127, 9}_0 ∨ false 
c  in DIMACS:
-20267 -20268 -20269  0

c INIT for k = 128
c    -b^{128, 1}_2
c    -b^{128, 1}_1
c    -b^{128, 1}_0
c  in DIMACS:
-20273 0
-20274 0
-20275 0

c Transitions for k = 128
c i = 1
c  -2+1 --> -1
c    ( b^{128, 1}_2 ∧  b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧  p_128) -> ( b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0)
c  in CNF:
c    -b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨  b^{128, 2}_2
c    -b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_1
c    -b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨  b^{128, 2}_0
c  in DIMACS:
-20273 -20274  20275 -128  20276 0
-20273 -20274  20275 -128 -20277 0
-20273 -20274  20275 -128  20278 0

c  -1+1 --> 0
c    ( b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧  b^{128, 1}_0 ∧  p_128) -> (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧ -b^{128, 2}_0)
c  in CNF:
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_2
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_1
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_0
c  in DIMACS:
-20273  20274 -20275 -128 -20276 0
-20273  20274 -20275 -128 -20277 0
-20273  20274 -20275 -128 -20278 0

c  0+1 --> 1
c    (-b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧  p_128) -> (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0)
c  in CNF:
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_2
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_1
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨  b^{128, 2}_0
c  in DIMACS:
 20273  20274  20275 -128 -20276 0
 20273  20274  20275 -128 -20277 0
 20273  20274  20275 -128  20278 0

c  1+1 --> 2
c    (-b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧  b^{128, 1}_0 ∧  p_128) -> (-b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0)
c  in CNF:
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_2
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨  b^{128, 2}_1
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ -p_128 ∨ -b^{128, 2}_0
c  in DIMACS:
 20273  20274 -20275 -128 -20276 0
 20273  20274 -20275 -128  20277 0
 20273  20274 -20275 -128 -20278 0

c  2+1 --> break 
c    (-b^{128, 1}_2 ∧  b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧  p_128) -> break
c  in CNF:
c     b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ -p_128 ∨ break
c  in DIMACS:
 20273 -20274  20275 -128 1162 0


c  2-1 --> 1
c    (-b^{128, 1}_2 ∧  b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧ -p_128) -> (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0)
c  in CNF:
c     b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_2
c     b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_1
c     b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨  b^{128, 2}_0
c  in DIMACS:
 20273 -20274  20275  128 -20276 0
 20273 -20274  20275  128 -20277 0
 20273 -20274  20275  128  20278 0

c  1-1 --> 0
c    (-b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧  b^{128, 1}_0 ∧ -p_128) -> (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧ -b^{128, 2}_0)
c  in CNF:
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_2
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_1
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_0
c  in DIMACS:
 20273  20274 -20275  128 -20276 0
 20273  20274 -20275  128 -20277 0
 20273  20274 -20275  128 -20278 0

c  0-1 --> -1
c    (-b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧ -p_128) -> ( b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0)
c  in CNF:
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨  b^{128, 2}_2
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_1
c     b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨  b^{128, 2}_0
c  in DIMACS:
 20273  20274  20275  128  20276 0
 20273  20274  20275  128 -20277 0
 20273  20274  20275  128  20278 0

c  -1-1 --> -2
c    ( b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧  b^{128, 1}_0 ∧ -p_128) -> ( b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0)
c  in CNF:
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨  b^{128, 2}_2
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨  b^{128, 2}_1
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨  p_128 ∨ -b^{128, 2}_0
c  in DIMACS:
-20273  20274 -20275  128  20276 0
-20273  20274 -20275  128  20277 0
-20273  20274 -20275  128 -20278 0

c  -2-1 --> break 
c    ( b^{128, 1}_2 ∧  b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧ -p_128) -> break
c  in CNF:
c    -b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨  b^{128, 1}_0 ∨  p_128 ∨ break
c  in DIMACS:
-20273 -20274  20275  128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 1}_2 ∧ -b^{128, 1}_1 ∧ -b^{128, 1}_0 ∧ true) 
c  in CNF:
c    -b^{128, 1}_2 ∨  b^{128, 1}_1 ∨  b^{128, 1}_0 ∨ false 
c  in DIMACS:
-20273  20274  20275  0

c  3 does not represent an automaton state.
c    -(-b^{128, 1}_2 ∧  b^{128, 1}_1 ∧  b^{128, 1}_0 ∧ true) 
c  in CNF:
c     b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ false 
c  in DIMACS:
 20273 -20274 -20275  0
c  -3 does not represent an automaton state.
c    -( b^{128, 1}_2 ∧  b^{128, 1}_1 ∧  b^{128, 1}_0 ∧ true) 
c  in CNF:
c    -b^{128, 1}_2 ∨ -b^{128, 1}_1 ∨ -b^{128, 1}_0 ∨ false 
c  in DIMACS:
-20273 -20274 -20275  0

c i = 2
c  -2+1 --> -1
c    ( b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧  p_256) -> ( b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0)
c  in CNF:
c    -b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨  b^{128, 3}_2
c    -b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_1
c    -b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨  b^{128, 3}_0
c  in DIMACS:
-20276 -20277  20278 -256  20279 0
-20276 -20277  20278 -256 -20280 0
-20276 -20277  20278 -256  20281 0

c  -1+1 --> 0
c    ( b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0 ∧  p_256) -> (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧ -b^{128, 3}_0)
c  in CNF:
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_2
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_1
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_0
c  in DIMACS:
-20276  20277 -20278 -256 -20279 0
-20276  20277 -20278 -256 -20280 0
-20276  20277 -20278 -256 -20281 0

c  0+1 --> 1
c    (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧  p_256) -> (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0)
c  in CNF:
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_2
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_1
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨  b^{128, 3}_0
c  in DIMACS:
 20276  20277  20278 -256 -20279 0
 20276  20277  20278 -256 -20280 0
 20276  20277  20278 -256  20281 0

c  1+1 --> 2
c    (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0 ∧  p_256) -> (-b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0)
c  in CNF:
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_2
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨  b^{128, 3}_1
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ -p_256 ∨ -b^{128, 3}_0
c  in DIMACS:
 20276  20277 -20278 -256 -20279 0
 20276  20277 -20278 -256  20280 0
 20276  20277 -20278 -256 -20281 0

c  2+1 --> break 
c    (-b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧  p_256) -> break
c  in CNF:
c     b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 20276 -20277  20278 -256 1162 0


c  2-1 --> 1
c    (-b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧ -p_256) -> (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0)
c  in CNF:
c     b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_2
c     b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_1
c     b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨  b^{128, 3}_0
c  in DIMACS:
 20276 -20277  20278  256 -20279 0
 20276 -20277  20278  256 -20280 0
 20276 -20277  20278  256  20281 0

c  1-1 --> 0
c    (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0 ∧ -p_256) -> (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧ -b^{128, 3}_0)
c  in CNF:
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_2
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_1
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_0
c  in DIMACS:
 20276  20277 -20278  256 -20279 0
 20276  20277 -20278  256 -20280 0
 20276  20277 -20278  256 -20281 0

c  0-1 --> -1
c    (-b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧ -p_256) -> ( b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0)
c  in CNF:
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨  b^{128, 3}_2
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_1
c     b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨  b^{128, 3}_0
c  in DIMACS:
 20276  20277  20278  256  20279 0
 20276  20277  20278  256 -20280 0
 20276  20277  20278  256  20281 0

c  -1-1 --> -2
c    ( b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧  b^{128, 2}_0 ∧ -p_256) -> ( b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0)
c  in CNF:
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨  b^{128, 3}_2
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨  b^{128, 3}_1
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨  p_256 ∨ -b^{128, 3}_0
c  in DIMACS:
-20276  20277 -20278  256  20279 0
-20276  20277 -20278  256  20280 0
-20276  20277 -20278  256 -20281 0

c  -2-1 --> break 
c    ( b^{128, 2}_2 ∧  b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨  b^{128, 2}_0 ∨  p_256 ∨ break
c  in DIMACS:
-20276 -20277  20278  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 2}_2 ∧ -b^{128, 2}_1 ∧ -b^{128, 2}_0 ∧ true) 
c  in CNF:
c    -b^{128, 2}_2 ∨  b^{128, 2}_1 ∨  b^{128, 2}_0 ∨ false 
c  in DIMACS:
-20276  20277  20278  0

c  3 does not represent an automaton state.
c    -(-b^{128, 2}_2 ∧  b^{128, 2}_1 ∧  b^{128, 2}_0 ∧ true) 
c  in CNF:
c     b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ false 
c  in DIMACS:
 20276 -20277 -20278  0
c  -3 does not represent an automaton state.
c    -( b^{128, 2}_2 ∧  b^{128, 2}_1 ∧  b^{128, 2}_0 ∧ true) 
c  in CNF:
c    -b^{128, 2}_2 ∨ -b^{128, 2}_1 ∨ -b^{128, 2}_0 ∨ false 
c  in DIMACS:
-20276 -20277 -20278  0

c i = 3
c  -2+1 --> -1
c    ( b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧  p_384) -> ( b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0)
c  in CNF:
c    -b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨  b^{128, 4}_2
c    -b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_1
c    -b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨  b^{128, 4}_0
c  in DIMACS:
-20279 -20280  20281 -384  20282 0
-20279 -20280  20281 -384 -20283 0
-20279 -20280  20281 -384  20284 0

c  -1+1 --> 0
c    ( b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0 ∧  p_384) -> (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧ -b^{128, 4}_0)
c  in CNF:
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_2
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_1
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_0
c  in DIMACS:
-20279  20280 -20281 -384 -20282 0
-20279  20280 -20281 -384 -20283 0
-20279  20280 -20281 -384 -20284 0

c  0+1 --> 1
c    (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧  p_384) -> (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0)
c  in CNF:
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_2
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_1
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨  b^{128, 4}_0
c  in DIMACS:
 20279  20280  20281 -384 -20282 0
 20279  20280  20281 -384 -20283 0
 20279  20280  20281 -384  20284 0

c  1+1 --> 2
c    (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0 ∧  p_384) -> (-b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0)
c  in CNF:
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_2
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨  b^{128, 4}_1
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ -p_384 ∨ -b^{128, 4}_0
c  in DIMACS:
 20279  20280 -20281 -384 -20282 0
 20279  20280 -20281 -384  20283 0
 20279  20280 -20281 -384 -20284 0

c  2+1 --> break 
c    (-b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧  p_384) -> break
c  in CNF:
c     b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 20279 -20280  20281 -384 1162 0


c  2-1 --> 1
c    (-b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧ -p_384) -> (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0)
c  in CNF:
c     b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_2
c     b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_1
c     b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨  b^{128, 4}_0
c  in DIMACS:
 20279 -20280  20281  384 -20282 0
 20279 -20280  20281  384 -20283 0
 20279 -20280  20281  384  20284 0

c  1-1 --> 0
c    (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0 ∧ -p_384) -> (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧ -b^{128, 4}_0)
c  in CNF:
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_2
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_1
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_0
c  in DIMACS:
 20279  20280 -20281  384 -20282 0
 20279  20280 -20281  384 -20283 0
 20279  20280 -20281  384 -20284 0

c  0-1 --> -1
c    (-b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧ -p_384) -> ( b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0)
c  in CNF:
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨  b^{128, 4}_2
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_1
c     b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨  b^{128, 4}_0
c  in DIMACS:
 20279  20280  20281  384  20282 0
 20279  20280  20281  384 -20283 0
 20279  20280  20281  384  20284 0

c  -1-1 --> -2
c    ( b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧  b^{128, 3}_0 ∧ -p_384) -> ( b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0)
c  in CNF:
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨  b^{128, 4}_2
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨  b^{128, 4}_1
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨  p_384 ∨ -b^{128, 4}_0
c  in DIMACS:
-20279  20280 -20281  384  20282 0
-20279  20280 -20281  384  20283 0
-20279  20280 -20281  384 -20284 0

c  -2-1 --> break 
c    ( b^{128, 3}_2 ∧  b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨  b^{128, 3}_0 ∨  p_384 ∨ break
c  in DIMACS:
-20279 -20280  20281  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 3}_2 ∧ -b^{128, 3}_1 ∧ -b^{128, 3}_0 ∧ true) 
c  in CNF:
c    -b^{128, 3}_2 ∨  b^{128, 3}_1 ∨  b^{128, 3}_0 ∨ false 
c  in DIMACS:
-20279  20280  20281  0

c  3 does not represent an automaton state.
c    -(-b^{128, 3}_2 ∧  b^{128, 3}_1 ∧  b^{128, 3}_0 ∧ true) 
c  in CNF:
c     b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ false 
c  in DIMACS:
 20279 -20280 -20281  0
c  -3 does not represent an automaton state.
c    -( b^{128, 3}_2 ∧  b^{128, 3}_1 ∧  b^{128, 3}_0 ∧ true) 
c  in CNF:
c    -b^{128, 3}_2 ∨ -b^{128, 3}_1 ∨ -b^{128, 3}_0 ∨ false 
c  in DIMACS:
-20279 -20280 -20281  0

c i = 4
c  -2+1 --> -1
c    ( b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧  p_512) -> ( b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0)
c  in CNF:
c    -b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨  b^{128, 5}_2
c    -b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_1
c    -b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨  b^{128, 5}_0
c  in DIMACS:
-20282 -20283  20284 -512  20285 0
-20282 -20283  20284 -512 -20286 0
-20282 -20283  20284 -512  20287 0

c  -1+1 --> 0
c    ( b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0 ∧  p_512) -> (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧ -b^{128, 5}_0)
c  in CNF:
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_2
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_1
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_0
c  in DIMACS:
-20282  20283 -20284 -512 -20285 0
-20282  20283 -20284 -512 -20286 0
-20282  20283 -20284 -512 -20287 0

c  0+1 --> 1
c    (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧  p_512) -> (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0)
c  in CNF:
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_2
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_1
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨  b^{128, 5}_0
c  in DIMACS:
 20282  20283  20284 -512 -20285 0
 20282  20283  20284 -512 -20286 0
 20282  20283  20284 -512  20287 0

c  1+1 --> 2
c    (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0 ∧  p_512) -> (-b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0)
c  in CNF:
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_2
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨  b^{128, 5}_1
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ -p_512 ∨ -b^{128, 5}_0
c  in DIMACS:
 20282  20283 -20284 -512 -20285 0
 20282  20283 -20284 -512  20286 0
 20282  20283 -20284 -512 -20287 0

c  2+1 --> break 
c    (-b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧  p_512) -> break
c  in CNF:
c     b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 20282 -20283  20284 -512 1162 0


c  2-1 --> 1
c    (-b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧ -p_512) -> (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0)
c  in CNF:
c     b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_2
c     b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_1
c     b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨  b^{128, 5}_0
c  in DIMACS:
 20282 -20283  20284  512 -20285 0
 20282 -20283  20284  512 -20286 0
 20282 -20283  20284  512  20287 0

c  1-1 --> 0
c    (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0 ∧ -p_512) -> (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧ -b^{128, 5}_0)
c  in CNF:
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_2
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_1
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_0
c  in DIMACS:
 20282  20283 -20284  512 -20285 0
 20282  20283 -20284  512 -20286 0
 20282  20283 -20284  512 -20287 0

c  0-1 --> -1
c    (-b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧ -p_512) -> ( b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0)
c  in CNF:
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨  b^{128, 5}_2
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_1
c     b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨  b^{128, 5}_0
c  in DIMACS:
 20282  20283  20284  512  20285 0
 20282  20283  20284  512 -20286 0
 20282  20283  20284  512  20287 0

c  -1-1 --> -2
c    ( b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧  b^{128, 4}_0 ∧ -p_512) -> ( b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0)
c  in CNF:
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨  b^{128, 5}_2
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨  b^{128, 5}_1
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨  p_512 ∨ -b^{128, 5}_0
c  in DIMACS:
-20282  20283 -20284  512  20285 0
-20282  20283 -20284  512  20286 0
-20282  20283 -20284  512 -20287 0

c  -2-1 --> break 
c    ( b^{128, 4}_2 ∧  b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨  b^{128, 4}_0 ∨  p_512 ∨ break
c  in DIMACS:
-20282 -20283  20284  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 4}_2 ∧ -b^{128, 4}_1 ∧ -b^{128, 4}_0 ∧ true) 
c  in CNF:
c    -b^{128, 4}_2 ∨  b^{128, 4}_1 ∨  b^{128, 4}_0 ∨ false 
c  in DIMACS:
-20282  20283  20284  0

c  3 does not represent an automaton state.
c    -(-b^{128, 4}_2 ∧  b^{128, 4}_1 ∧  b^{128, 4}_0 ∧ true) 
c  in CNF:
c     b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ false 
c  in DIMACS:
 20282 -20283 -20284  0
c  -3 does not represent an automaton state.
c    -( b^{128, 4}_2 ∧  b^{128, 4}_1 ∧  b^{128, 4}_0 ∧ true) 
c  in CNF:
c    -b^{128, 4}_2 ∨ -b^{128, 4}_1 ∨ -b^{128, 4}_0 ∨ false 
c  in DIMACS:
-20282 -20283 -20284  0

c i = 5
c  -2+1 --> -1
c    ( b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧  p_640) -> ( b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0)
c  in CNF:
c    -b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨  b^{128, 6}_2
c    -b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_1
c    -b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨  b^{128, 6}_0
c  in DIMACS:
-20285 -20286  20287 -640  20288 0
-20285 -20286  20287 -640 -20289 0
-20285 -20286  20287 -640  20290 0

c  -1+1 --> 0
c    ( b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0 ∧  p_640) -> (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧ -b^{128, 6}_0)
c  in CNF:
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_2
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_1
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_0
c  in DIMACS:
-20285  20286 -20287 -640 -20288 0
-20285  20286 -20287 -640 -20289 0
-20285  20286 -20287 -640 -20290 0

c  0+1 --> 1
c    (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧  p_640) -> (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0)
c  in CNF:
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_2
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_1
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨  b^{128, 6}_0
c  in DIMACS:
 20285  20286  20287 -640 -20288 0
 20285  20286  20287 -640 -20289 0
 20285  20286  20287 -640  20290 0

c  1+1 --> 2
c    (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0 ∧  p_640) -> (-b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0)
c  in CNF:
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_2
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨  b^{128, 6}_1
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ -p_640 ∨ -b^{128, 6}_0
c  in DIMACS:
 20285  20286 -20287 -640 -20288 0
 20285  20286 -20287 -640  20289 0
 20285  20286 -20287 -640 -20290 0

c  2+1 --> break 
c    (-b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧  p_640) -> break
c  in CNF:
c     b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 20285 -20286  20287 -640 1162 0


c  2-1 --> 1
c    (-b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧ -p_640) -> (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0)
c  in CNF:
c     b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_2
c     b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_1
c     b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨  b^{128, 6}_0
c  in DIMACS:
 20285 -20286  20287  640 -20288 0
 20285 -20286  20287  640 -20289 0
 20285 -20286  20287  640  20290 0

c  1-1 --> 0
c    (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0 ∧ -p_640) -> (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧ -b^{128, 6}_0)
c  in CNF:
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_2
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_1
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_0
c  in DIMACS:
 20285  20286 -20287  640 -20288 0
 20285  20286 -20287  640 -20289 0
 20285  20286 -20287  640 -20290 0

c  0-1 --> -1
c    (-b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧ -p_640) -> ( b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0)
c  in CNF:
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨  b^{128, 6}_2
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_1
c     b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨  b^{128, 6}_0
c  in DIMACS:
 20285  20286  20287  640  20288 0
 20285  20286  20287  640 -20289 0
 20285  20286  20287  640  20290 0

c  -1-1 --> -2
c    ( b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧  b^{128, 5}_0 ∧ -p_640) -> ( b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0)
c  in CNF:
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨  b^{128, 6}_2
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨  b^{128, 6}_1
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨  p_640 ∨ -b^{128, 6}_0
c  in DIMACS:
-20285  20286 -20287  640  20288 0
-20285  20286 -20287  640  20289 0
-20285  20286 -20287  640 -20290 0

c  -2-1 --> break 
c    ( b^{128, 5}_2 ∧  b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨  b^{128, 5}_0 ∨  p_640 ∨ break
c  in DIMACS:
-20285 -20286  20287  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 5}_2 ∧ -b^{128, 5}_1 ∧ -b^{128, 5}_0 ∧ true) 
c  in CNF:
c    -b^{128, 5}_2 ∨  b^{128, 5}_1 ∨  b^{128, 5}_0 ∨ false 
c  in DIMACS:
-20285  20286  20287  0

c  3 does not represent an automaton state.
c    -(-b^{128, 5}_2 ∧  b^{128, 5}_1 ∧  b^{128, 5}_0 ∧ true) 
c  in CNF:
c     b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ false 
c  in DIMACS:
 20285 -20286 -20287  0
c  -3 does not represent an automaton state.
c    -( b^{128, 5}_2 ∧  b^{128, 5}_1 ∧  b^{128, 5}_0 ∧ true) 
c  in CNF:
c    -b^{128, 5}_2 ∨ -b^{128, 5}_1 ∨ -b^{128, 5}_0 ∨ false 
c  in DIMACS:
-20285 -20286 -20287  0

c i = 6
c  -2+1 --> -1
c    ( b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧  p_768) -> ( b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0)
c  in CNF:
c    -b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨  b^{128, 7}_2
c    -b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_1
c    -b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨  b^{128, 7}_0
c  in DIMACS:
-20288 -20289  20290 -768  20291 0
-20288 -20289  20290 -768 -20292 0
-20288 -20289  20290 -768  20293 0

c  -1+1 --> 0
c    ( b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0 ∧  p_768) -> (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧ -b^{128, 7}_0)
c  in CNF:
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_2
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_1
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_0
c  in DIMACS:
-20288  20289 -20290 -768 -20291 0
-20288  20289 -20290 -768 -20292 0
-20288  20289 -20290 -768 -20293 0

c  0+1 --> 1
c    (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧  p_768) -> (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0)
c  in CNF:
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_2
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_1
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨  b^{128, 7}_0
c  in DIMACS:
 20288  20289  20290 -768 -20291 0
 20288  20289  20290 -768 -20292 0
 20288  20289  20290 -768  20293 0

c  1+1 --> 2
c    (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0 ∧  p_768) -> (-b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0)
c  in CNF:
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_2
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨  b^{128, 7}_1
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ -p_768 ∨ -b^{128, 7}_0
c  in DIMACS:
 20288  20289 -20290 -768 -20291 0
 20288  20289 -20290 -768  20292 0
 20288  20289 -20290 -768 -20293 0

c  2+1 --> break 
c    (-b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧  p_768) -> break
c  in CNF:
c     b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 20288 -20289  20290 -768 1162 0


c  2-1 --> 1
c    (-b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧ -p_768) -> (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0)
c  in CNF:
c     b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_2
c     b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_1
c     b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨  b^{128, 7}_0
c  in DIMACS:
 20288 -20289  20290  768 -20291 0
 20288 -20289  20290  768 -20292 0
 20288 -20289  20290  768  20293 0

c  1-1 --> 0
c    (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0 ∧ -p_768) -> (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧ -b^{128, 7}_0)
c  in CNF:
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_2
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_1
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_0
c  in DIMACS:
 20288  20289 -20290  768 -20291 0
 20288  20289 -20290  768 -20292 0
 20288  20289 -20290  768 -20293 0

c  0-1 --> -1
c    (-b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧ -p_768) -> ( b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0)
c  in CNF:
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨  b^{128, 7}_2
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_1
c     b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨  b^{128, 7}_0
c  in DIMACS:
 20288  20289  20290  768  20291 0
 20288  20289  20290  768 -20292 0
 20288  20289  20290  768  20293 0

c  -1-1 --> -2
c    ( b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧  b^{128, 6}_0 ∧ -p_768) -> ( b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0)
c  in CNF:
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨  b^{128, 7}_2
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨  b^{128, 7}_1
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨  p_768 ∨ -b^{128, 7}_0
c  in DIMACS:
-20288  20289 -20290  768  20291 0
-20288  20289 -20290  768  20292 0
-20288  20289 -20290  768 -20293 0

c  -2-1 --> break 
c    ( b^{128, 6}_2 ∧  b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨  b^{128, 6}_0 ∨  p_768 ∨ break
c  in DIMACS:
-20288 -20289  20290  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 6}_2 ∧ -b^{128, 6}_1 ∧ -b^{128, 6}_0 ∧ true) 
c  in CNF:
c    -b^{128, 6}_2 ∨  b^{128, 6}_1 ∨  b^{128, 6}_0 ∨ false 
c  in DIMACS:
-20288  20289  20290  0

c  3 does not represent an automaton state.
c    -(-b^{128, 6}_2 ∧  b^{128, 6}_1 ∧  b^{128, 6}_0 ∧ true) 
c  in CNF:
c     b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ false 
c  in DIMACS:
 20288 -20289 -20290  0
c  -3 does not represent an automaton state.
c    -( b^{128, 6}_2 ∧  b^{128, 6}_1 ∧  b^{128, 6}_0 ∧ true) 
c  in CNF:
c    -b^{128, 6}_2 ∨ -b^{128, 6}_1 ∨ -b^{128, 6}_0 ∨ false 
c  in DIMACS:
-20288 -20289 -20290  0

c i = 7
c  -2+1 --> -1
c    ( b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧  p_896) -> ( b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0)
c  in CNF:
c    -b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨  b^{128, 8}_2
c    -b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_1
c    -b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨  b^{128, 8}_0
c  in DIMACS:
-20291 -20292  20293 -896  20294 0
-20291 -20292  20293 -896 -20295 0
-20291 -20292  20293 -896  20296 0

c  -1+1 --> 0
c    ( b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0 ∧  p_896) -> (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧ -b^{128, 8}_0)
c  in CNF:
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_2
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_1
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_0
c  in DIMACS:
-20291  20292 -20293 -896 -20294 0
-20291  20292 -20293 -896 -20295 0
-20291  20292 -20293 -896 -20296 0

c  0+1 --> 1
c    (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧  p_896) -> (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0)
c  in CNF:
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_2
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_1
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨  b^{128, 8}_0
c  in DIMACS:
 20291  20292  20293 -896 -20294 0
 20291  20292  20293 -896 -20295 0
 20291  20292  20293 -896  20296 0

c  1+1 --> 2
c    (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0 ∧  p_896) -> (-b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0)
c  in CNF:
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_2
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨  b^{128, 8}_1
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ -p_896 ∨ -b^{128, 8}_0
c  in DIMACS:
 20291  20292 -20293 -896 -20294 0
 20291  20292 -20293 -896  20295 0
 20291  20292 -20293 -896 -20296 0

c  2+1 --> break 
c    (-b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧  p_896) -> break
c  in CNF:
c     b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 20291 -20292  20293 -896 1162 0


c  2-1 --> 1
c    (-b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧ -p_896) -> (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0)
c  in CNF:
c     b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_2
c     b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_1
c     b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨  b^{128, 8}_0
c  in DIMACS:
 20291 -20292  20293  896 -20294 0
 20291 -20292  20293  896 -20295 0
 20291 -20292  20293  896  20296 0

c  1-1 --> 0
c    (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0 ∧ -p_896) -> (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧ -b^{128, 8}_0)
c  in CNF:
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_2
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_1
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_0
c  in DIMACS:
 20291  20292 -20293  896 -20294 0
 20291  20292 -20293  896 -20295 0
 20291  20292 -20293  896 -20296 0

c  0-1 --> -1
c    (-b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧ -p_896) -> ( b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0)
c  in CNF:
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨  b^{128, 8}_2
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_1
c     b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨  b^{128, 8}_0
c  in DIMACS:
 20291  20292  20293  896  20294 0
 20291  20292  20293  896 -20295 0
 20291  20292  20293  896  20296 0

c  -1-1 --> -2
c    ( b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧  b^{128, 7}_0 ∧ -p_896) -> ( b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0)
c  in CNF:
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨  b^{128, 8}_2
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨  b^{128, 8}_1
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨  p_896 ∨ -b^{128, 8}_0
c  in DIMACS:
-20291  20292 -20293  896  20294 0
-20291  20292 -20293  896  20295 0
-20291  20292 -20293  896 -20296 0

c  -2-1 --> break 
c    ( b^{128, 7}_2 ∧  b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨  b^{128, 7}_0 ∨  p_896 ∨ break
c  in DIMACS:
-20291 -20292  20293  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 7}_2 ∧ -b^{128, 7}_1 ∧ -b^{128, 7}_0 ∧ true) 
c  in CNF:
c    -b^{128, 7}_2 ∨  b^{128, 7}_1 ∨  b^{128, 7}_0 ∨ false 
c  in DIMACS:
-20291  20292  20293  0

c  3 does not represent an automaton state.
c    -(-b^{128, 7}_2 ∧  b^{128, 7}_1 ∧  b^{128, 7}_0 ∧ true) 
c  in CNF:
c     b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ false 
c  in DIMACS:
 20291 -20292 -20293  0
c  -3 does not represent an automaton state.
c    -( b^{128, 7}_2 ∧  b^{128, 7}_1 ∧  b^{128, 7}_0 ∧ true) 
c  in CNF:
c    -b^{128, 7}_2 ∨ -b^{128, 7}_1 ∨ -b^{128, 7}_0 ∨ false 
c  in DIMACS:
-20291 -20292 -20293  0

c i = 8
c  -2+1 --> -1
c    ( b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧  p_1024) -> ( b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0)
c  in CNF:
c    -b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨  b^{128, 9}_2
c    -b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_1
c    -b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨  b^{128, 9}_0
c  in DIMACS:
-20294 -20295  20296 -1024  20297 0
-20294 -20295  20296 -1024 -20298 0
-20294 -20295  20296 -1024  20299 0

c  -1+1 --> 0
c    ( b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0 ∧  p_1024) -> (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧ -b^{128, 9}_0)
c  in CNF:
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_2
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_1
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_0
c  in DIMACS:
-20294  20295 -20296 -1024 -20297 0
-20294  20295 -20296 -1024 -20298 0
-20294  20295 -20296 -1024 -20299 0

c  0+1 --> 1
c    (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧  p_1024) -> (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0)
c  in CNF:
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_2
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_1
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨  b^{128, 9}_0
c  in DIMACS:
 20294  20295  20296 -1024 -20297 0
 20294  20295  20296 -1024 -20298 0
 20294  20295  20296 -1024  20299 0

c  1+1 --> 2
c    (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0 ∧  p_1024) -> (-b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0)
c  in CNF:
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_2
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨  b^{128, 9}_1
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ -p_1024 ∨ -b^{128, 9}_0
c  in DIMACS:
 20294  20295 -20296 -1024 -20297 0
 20294  20295 -20296 -1024  20298 0
 20294  20295 -20296 -1024 -20299 0

c  2+1 --> break 
c    (-b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 20294 -20295  20296 -1024 1162 0


c  2-1 --> 1
c    (-b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧ -p_1024) -> (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0)
c  in CNF:
c     b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_2
c     b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_1
c     b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨  b^{128, 9}_0
c  in DIMACS:
 20294 -20295  20296  1024 -20297 0
 20294 -20295  20296  1024 -20298 0
 20294 -20295  20296  1024  20299 0

c  1-1 --> 0
c    (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0 ∧ -p_1024) -> (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧ -b^{128, 9}_0)
c  in CNF:
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_2
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_1
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_0
c  in DIMACS:
 20294  20295 -20296  1024 -20297 0
 20294  20295 -20296  1024 -20298 0
 20294  20295 -20296  1024 -20299 0

c  0-1 --> -1
c    (-b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧ -p_1024) -> ( b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0)
c  in CNF:
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨  b^{128, 9}_2
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_1
c     b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨  b^{128, 9}_0
c  in DIMACS:
 20294  20295  20296  1024  20297 0
 20294  20295  20296  1024 -20298 0
 20294  20295  20296  1024  20299 0

c  -1-1 --> -2
c    ( b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧  b^{128, 8}_0 ∧ -p_1024) -> ( b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0)
c  in CNF:
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨  b^{128, 9}_2
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨  b^{128, 9}_1
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨  p_1024 ∨ -b^{128, 9}_0
c  in DIMACS:
-20294  20295 -20296  1024  20297 0
-20294  20295 -20296  1024  20298 0
-20294  20295 -20296  1024 -20299 0

c  -2-1 --> break 
c    ( b^{128, 8}_2 ∧  b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨  b^{128, 8}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-20294 -20295  20296  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 8}_2 ∧ -b^{128, 8}_1 ∧ -b^{128, 8}_0 ∧ true) 
c  in CNF:
c    -b^{128, 8}_2 ∨  b^{128, 8}_1 ∨  b^{128, 8}_0 ∨ false 
c  in DIMACS:
-20294  20295  20296  0

c  3 does not represent an automaton state.
c    -(-b^{128, 8}_2 ∧  b^{128, 8}_1 ∧  b^{128, 8}_0 ∧ true) 
c  in CNF:
c     b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ false 
c  in DIMACS:
 20294 -20295 -20296  0
c  -3 does not represent an automaton state.
c    -( b^{128, 8}_2 ∧  b^{128, 8}_1 ∧  b^{128, 8}_0 ∧ true) 
c  in CNF:
c    -b^{128, 8}_2 ∨ -b^{128, 8}_1 ∨ -b^{128, 8}_0 ∨ false 
c  in DIMACS:
-20294 -20295 -20296  0

c i = 9
c  -2+1 --> -1
c    ( b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧  p_1152) -> ( b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧  b^{128, 10}_0)
c  in CNF:
c    -b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨  b^{128, 10}_2
c    -b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_1
c    -b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨  b^{128, 10}_0
c  in DIMACS:
-20297 -20298  20299 -1152  20300 0
-20297 -20298  20299 -1152 -20301 0
-20297 -20298  20299 -1152  20302 0

c  -1+1 --> 0
c    ( b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0 ∧  p_1152) -> (-b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧ -b^{128, 10}_0)
c  in CNF:
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_2
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_1
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_0
c  in DIMACS:
-20297  20298 -20299 -1152 -20300 0
-20297  20298 -20299 -1152 -20301 0
-20297  20298 -20299 -1152 -20302 0

c  0+1 --> 1
c    (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧  p_1152) -> (-b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧  b^{128, 10}_0)
c  in CNF:
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_2
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_1
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨  b^{128, 10}_0
c  in DIMACS:
 20297  20298  20299 -1152 -20300 0
 20297  20298  20299 -1152 -20301 0
 20297  20298  20299 -1152  20302 0

c  1+1 --> 2
c    (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0 ∧  p_1152) -> (-b^{128, 10}_2 ∧  b^{128, 10}_1 ∧ -b^{128, 10}_0)
c  in CNF:
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_2
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨  b^{128, 10}_1
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ -p_1152 ∨ -b^{128, 10}_0
c  in DIMACS:
 20297  20298 -20299 -1152 -20300 0
 20297  20298 -20299 -1152  20301 0
 20297  20298 -20299 -1152 -20302 0

c  2+1 --> break 
c    (-b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 20297 -20298  20299 -1152 1162 0


c  2-1 --> 1
c    (-b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧ -p_1152) -> (-b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧  b^{128, 10}_0)
c  in CNF:
c     b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_2
c     b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_1
c     b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨  b^{128, 10}_0
c  in DIMACS:
 20297 -20298  20299  1152 -20300 0
 20297 -20298  20299  1152 -20301 0
 20297 -20298  20299  1152  20302 0

c  1-1 --> 0
c    (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0 ∧ -p_1152) -> (-b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧ -b^{128, 10}_0)
c  in CNF:
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_2
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_1
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_0
c  in DIMACS:
 20297  20298 -20299  1152 -20300 0
 20297  20298 -20299  1152 -20301 0
 20297  20298 -20299  1152 -20302 0

c  0-1 --> -1
c    (-b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧ -p_1152) -> ( b^{128, 10}_2 ∧ -b^{128, 10}_1 ∧  b^{128, 10}_0)
c  in CNF:
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨  b^{128, 10}_2
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_1
c     b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨  b^{128, 10}_0
c  in DIMACS:
 20297  20298  20299  1152  20300 0
 20297  20298  20299  1152 -20301 0
 20297  20298  20299  1152  20302 0

c  -1-1 --> -2
c    ( b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧  b^{128, 9}_0 ∧ -p_1152) -> ( b^{128, 10}_2 ∧  b^{128, 10}_1 ∧ -b^{128, 10}_0)
c  in CNF:
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨  b^{128, 10}_2
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨  b^{128, 10}_1
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨  p_1152 ∨ -b^{128, 10}_0
c  in DIMACS:
-20297  20298 -20299  1152  20300 0
-20297  20298 -20299  1152  20301 0
-20297  20298 -20299  1152 -20302 0

c  -2-1 --> break 
c    ( b^{128, 9}_2 ∧  b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨  b^{128, 9}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-20297 -20298  20299  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{128, 9}_2 ∧ -b^{128, 9}_1 ∧ -b^{128, 9}_0 ∧ true) 
c  in CNF:
c    -b^{128, 9}_2 ∨  b^{128, 9}_1 ∨  b^{128, 9}_0 ∨ false 
c  in DIMACS:
-20297  20298  20299  0

c  3 does not represent an automaton state.
c    -(-b^{128, 9}_2 ∧  b^{128, 9}_1 ∧  b^{128, 9}_0 ∧ true) 
c  in CNF:
c     b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ false 
c  in DIMACS:
 20297 -20298 -20299  0
c  -3 does not represent an automaton state.
c    -( b^{128, 9}_2 ∧  b^{128, 9}_1 ∧  b^{128, 9}_0 ∧ true) 
c  in CNF:
c    -b^{128, 9}_2 ∨ -b^{128, 9}_1 ∨ -b^{128, 9}_0 ∨ false 
c  in DIMACS:
-20297 -20298 -20299  0

c INIT for k = 129
c    -b^{129, 1}_2
c    -b^{129, 1}_1
c    -b^{129, 1}_0
c  in DIMACS:
-20303 0
-20304 0
-20305 0

c Transitions for k = 129
c i = 1
c  -2+1 --> -1
c    ( b^{129, 1}_2 ∧  b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧  p_129) -> ( b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0)
c  in CNF:
c    -b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨  b^{129, 2}_2
c    -b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_1
c    -b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨  b^{129, 2}_0
c  in DIMACS:
-20303 -20304  20305 -129  20306 0
-20303 -20304  20305 -129 -20307 0
-20303 -20304  20305 -129  20308 0

c  -1+1 --> 0
c    ( b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧  b^{129, 1}_0 ∧  p_129) -> (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧ -b^{129, 2}_0)
c  in CNF:
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_2
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_1
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_0
c  in DIMACS:
-20303  20304 -20305 -129 -20306 0
-20303  20304 -20305 -129 -20307 0
-20303  20304 -20305 -129 -20308 0

c  0+1 --> 1
c    (-b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧  p_129) -> (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0)
c  in CNF:
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_2
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_1
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨  b^{129, 2}_0
c  in DIMACS:
 20303  20304  20305 -129 -20306 0
 20303  20304  20305 -129 -20307 0
 20303  20304  20305 -129  20308 0

c  1+1 --> 2
c    (-b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧  b^{129, 1}_0 ∧  p_129) -> (-b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0)
c  in CNF:
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_2
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨  b^{129, 2}_1
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ -p_129 ∨ -b^{129, 2}_0
c  in DIMACS:
 20303  20304 -20305 -129 -20306 0
 20303  20304 -20305 -129  20307 0
 20303  20304 -20305 -129 -20308 0

c  2+1 --> break 
c    (-b^{129, 1}_2 ∧  b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧  p_129) -> break
c  in CNF:
c     b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ -p_129 ∨ break
c  in DIMACS:
 20303 -20304  20305 -129 1162 0


c  2-1 --> 1
c    (-b^{129, 1}_2 ∧  b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧ -p_129) -> (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0)
c  in CNF:
c     b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_2
c     b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_1
c     b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨  b^{129, 2}_0
c  in DIMACS:
 20303 -20304  20305  129 -20306 0
 20303 -20304  20305  129 -20307 0
 20303 -20304  20305  129  20308 0

c  1-1 --> 0
c    (-b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧  b^{129, 1}_0 ∧ -p_129) -> (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧ -b^{129, 2}_0)
c  in CNF:
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_2
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_1
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_0
c  in DIMACS:
 20303  20304 -20305  129 -20306 0
 20303  20304 -20305  129 -20307 0
 20303  20304 -20305  129 -20308 0

c  0-1 --> -1
c    (-b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧ -p_129) -> ( b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0)
c  in CNF:
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨  b^{129, 2}_2
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_1
c     b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨  b^{129, 2}_0
c  in DIMACS:
 20303  20304  20305  129  20306 0
 20303  20304  20305  129 -20307 0
 20303  20304  20305  129  20308 0

c  -1-1 --> -2
c    ( b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧  b^{129, 1}_0 ∧ -p_129) -> ( b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0)
c  in CNF:
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨  b^{129, 2}_2
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨  b^{129, 2}_1
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨  p_129 ∨ -b^{129, 2}_0
c  in DIMACS:
-20303  20304 -20305  129  20306 0
-20303  20304 -20305  129  20307 0
-20303  20304 -20305  129 -20308 0

c  -2-1 --> break 
c    ( b^{129, 1}_2 ∧  b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧ -p_129) -> break
c  in CNF:
c    -b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨  b^{129, 1}_0 ∨  p_129 ∨ break
c  in DIMACS:
-20303 -20304  20305  129 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 1}_2 ∧ -b^{129, 1}_1 ∧ -b^{129, 1}_0 ∧ true) 
c  in CNF:
c    -b^{129, 1}_2 ∨  b^{129, 1}_1 ∨  b^{129, 1}_0 ∨ false 
c  in DIMACS:
-20303  20304  20305  0

c  3 does not represent an automaton state.
c    -(-b^{129, 1}_2 ∧  b^{129, 1}_1 ∧  b^{129, 1}_0 ∧ true) 
c  in CNF:
c     b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ false 
c  in DIMACS:
 20303 -20304 -20305  0
c  -3 does not represent an automaton state.
c    -( b^{129, 1}_2 ∧  b^{129, 1}_1 ∧  b^{129, 1}_0 ∧ true) 
c  in CNF:
c    -b^{129, 1}_2 ∨ -b^{129, 1}_1 ∨ -b^{129, 1}_0 ∨ false 
c  in DIMACS:
-20303 -20304 -20305  0

c i = 2
c  -2+1 --> -1
c    ( b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧  p_258) -> ( b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0)
c  in CNF:
c    -b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨  b^{129, 3}_2
c    -b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_1
c    -b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨  b^{129, 3}_0
c  in DIMACS:
-20306 -20307  20308 -258  20309 0
-20306 -20307  20308 -258 -20310 0
-20306 -20307  20308 -258  20311 0

c  -1+1 --> 0
c    ( b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0 ∧  p_258) -> (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧ -b^{129, 3}_0)
c  in CNF:
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_2
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_1
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_0
c  in DIMACS:
-20306  20307 -20308 -258 -20309 0
-20306  20307 -20308 -258 -20310 0
-20306  20307 -20308 -258 -20311 0

c  0+1 --> 1
c    (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧  p_258) -> (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0)
c  in CNF:
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_2
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_1
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨  b^{129, 3}_0
c  in DIMACS:
 20306  20307  20308 -258 -20309 0
 20306  20307  20308 -258 -20310 0
 20306  20307  20308 -258  20311 0

c  1+1 --> 2
c    (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0 ∧  p_258) -> (-b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0)
c  in CNF:
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_2
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨  b^{129, 3}_1
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ -p_258 ∨ -b^{129, 3}_0
c  in DIMACS:
 20306  20307 -20308 -258 -20309 0
 20306  20307 -20308 -258  20310 0
 20306  20307 -20308 -258 -20311 0

c  2+1 --> break 
c    (-b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧  p_258) -> break
c  in CNF:
c     b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 20306 -20307  20308 -258 1162 0


c  2-1 --> 1
c    (-b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧ -p_258) -> (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0)
c  in CNF:
c     b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_2
c     b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_1
c     b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨  b^{129, 3}_0
c  in DIMACS:
 20306 -20307  20308  258 -20309 0
 20306 -20307  20308  258 -20310 0
 20306 -20307  20308  258  20311 0

c  1-1 --> 0
c    (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0 ∧ -p_258) -> (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧ -b^{129, 3}_0)
c  in CNF:
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_2
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_1
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_0
c  in DIMACS:
 20306  20307 -20308  258 -20309 0
 20306  20307 -20308  258 -20310 0
 20306  20307 -20308  258 -20311 0

c  0-1 --> -1
c    (-b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧ -p_258) -> ( b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0)
c  in CNF:
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨  b^{129, 3}_2
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_1
c     b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨  b^{129, 3}_0
c  in DIMACS:
 20306  20307  20308  258  20309 0
 20306  20307  20308  258 -20310 0
 20306  20307  20308  258  20311 0

c  -1-1 --> -2
c    ( b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧  b^{129, 2}_0 ∧ -p_258) -> ( b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0)
c  in CNF:
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨  b^{129, 3}_2
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨  b^{129, 3}_1
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨  p_258 ∨ -b^{129, 3}_0
c  in DIMACS:
-20306  20307 -20308  258  20309 0
-20306  20307 -20308  258  20310 0
-20306  20307 -20308  258 -20311 0

c  -2-1 --> break 
c    ( b^{129, 2}_2 ∧  b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨  b^{129, 2}_0 ∨  p_258 ∨ break
c  in DIMACS:
-20306 -20307  20308  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 2}_2 ∧ -b^{129, 2}_1 ∧ -b^{129, 2}_0 ∧ true) 
c  in CNF:
c    -b^{129, 2}_2 ∨  b^{129, 2}_1 ∨  b^{129, 2}_0 ∨ false 
c  in DIMACS:
-20306  20307  20308  0

c  3 does not represent an automaton state.
c    -(-b^{129, 2}_2 ∧  b^{129, 2}_1 ∧  b^{129, 2}_0 ∧ true) 
c  in CNF:
c     b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ false 
c  in DIMACS:
 20306 -20307 -20308  0
c  -3 does not represent an automaton state.
c    -( b^{129, 2}_2 ∧  b^{129, 2}_1 ∧  b^{129, 2}_0 ∧ true) 
c  in CNF:
c    -b^{129, 2}_2 ∨ -b^{129, 2}_1 ∨ -b^{129, 2}_0 ∨ false 
c  in DIMACS:
-20306 -20307 -20308  0

c i = 3
c  -2+1 --> -1
c    ( b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧  p_387) -> ( b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0)
c  in CNF:
c    -b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨  b^{129, 4}_2
c    -b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_1
c    -b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨  b^{129, 4}_0
c  in DIMACS:
-20309 -20310  20311 -387  20312 0
-20309 -20310  20311 -387 -20313 0
-20309 -20310  20311 -387  20314 0

c  -1+1 --> 0
c    ( b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0 ∧  p_387) -> (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧ -b^{129, 4}_0)
c  in CNF:
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_2
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_1
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_0
c  in DIMACS:
-20309  20310 -20311 -387 -20312 0
-20309  20310 -20311 -387 -20313 0
-20309  20310 -20311 -387 -20314 0

c  0+1 --> 1
c    (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧  p_387) -> (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0)
c  in CNF:
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_2
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_1
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨  b^{129, 4}_0
c  in DIMACS:
 20309  20310  20311 -387 -20312 0
 20309  20310  20311 -387 -20313 0
 20309  20310  20311 -387  20314 0

c  1+1 --> 2
c    (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0 ∧  p_387) -> (-b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0)
c  in CNF:
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_2
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨  b^{129, 4}_1
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ -p_387 ∨ -b^{129, 4}_0
c  in DIMACS:
 20309  20310 -20311 -387 -20312 0
 20309  20310 -20311 -387  20313 0
 20309  20310 -20311 -387 -20314 0

c  2+1 --> break 
c    (-b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧  p_387) -> break
c  in CNF:
c     b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 20309 -20310  20311 -387 1162 0


c  2-1 --> 1
c    (-b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧ -p_387) -> (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0)
c  in CNF:
c     b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_2
c     b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_1
c     b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨  b^{129, 4}_0
c  in DIMACS:
 20309 -20310  20311  387 -20312 0
 20309 -20310  20311  387 -20313 0
 20309 -20310  20311  387  20314 0

c  1-1 --> 0
c    (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0 ∧ -p_387) -> (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧ -b^{129, 4}_0)
c  in CNF:
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_2
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_1
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_0
c  in DIMACS:
 20309  20310 -20311  387 -20312 0
 20309  20310 -20311  387 -20313 0
 20309  20310 -20311  387 -20314 0

c  0-1 --> -1
c    (-b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧ -p_387) -> ( b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0)
c  in CNF:
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨  b^{129, 4}_2
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_1
c     b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨  b^{129, 4}_0
c  in DIMACS:
 20309  20310  20311  387  20312 0
 20309  20310  20311  387 -20313 0
 20309  20310  20311  387  20314 0

c  -1-1 --> -2
c    ( b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧  b^{129, 3}_0 ∧ -p_387) -> ( b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0)
c  in CNF:
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨  b^{129, 4}_2
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨  b^{129, 4}_1
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨  p_387 ∨ -b^{129, 4}_0
c  in DIMACS:
-20309  20310 -20311  387  20312 0
-20309  20310 -20311  387  20313 0
-20309  20310 -20311  387 -20314 0

c  -2-1 --> break 
c    ( b^{129, 3}_2 ∧  b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨  b^{129, 3}_0 ∨  p_387 ∨ break
c  in DIMACS:
-20309 -20310  20311  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 3}_2 ∧ -b^{129, 3}_1 ∧ -b^{129, 3}_0 ∧ true) 
c  in CNF:
c    -b^{129, 3}_2 ∨  b^{129, 3}_1 ∨  b^{129, 3}_0 ∨ false 
c  in DIMACS:
-20309  20310  20311  0

c  3 does not represent an automaton state.
c    -(-b^{129, 3}_2 ∧  b^{129, 3}_1 ∧  b^{129, 3}_0 ∧ true) 
c  in CNF:
c     b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ false 
c  in DIMACS:
 20309 -20310 -20311  0
c  -3 does not represent an automaton state.
c    -( b^{129, 3}_2 ∧  b^{129, 3}_1 ∧  b^{129, 3}_0 ∧ true) 
c  in CNF:
c    -b^{129, 3}_2 ∨ -b^{129, 3}_1 ∨ -b^{129, 3}_0 ∨ false 
c  in DIMACS:
-20309 -20310 -20311  0

c i = 4
c  -2+1 --> -1
c    ( b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧  p_516) -> ( b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0)
c  in CNF:
c    -b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨  b^{129, 5}_2
c    -b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_1
c    -b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨  b^{129, 5}_0
c  in DIMACS:
-20312 -20313  20314 -516  20315 0
-20312 -20313  20314 -516 -20316 0
-20312 -20313  20314 -516  20317 0

c  -1+1 --> 0
c    ( b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0 ∧  p_516) -> (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧ -b^{129, 5}_0)
c  in CNF:
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_2
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_1
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_0
c  in DIMACS:
-20312  20313 -20314 -516 -20315 0
-20312  20313 -20314 -516 -20316 0
-20312  20313 -20314 -516 -20317 0

c  0+1 --> 1
c    (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧  p_516) -> (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0)
c  in CNF:
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_2
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_1
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨  b^{129, 5}_0
c  in DIMACS:
 20312  20313  20314 -516 -20315 0
 20312  20313  20314 -516 -20316 0
 20312  20313  20314 -516  20317 0

c  1+1 --> 2
c    (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0 ∧  p_516) -> (-b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0)
c  in CNF:
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_2
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨  b^{129, 5}_1
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ -p_516 ∨ -b^{129, 5}_0
c  in DIMACS:
 20312  20313 -20314 -516 -20315 0
 20312  20313 -20314 -516  20316 0
 20312  20313 -20314 -516 -20317 0

c  2+1 --> break 
c    (-b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧  p_516) -> break
c  in CNF:
c     b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 20312 -20313  20314 -516 1162 0


c  2-1 --> 1
c    (-b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧ -p_516) -> (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0)
c  in CNF:
c     b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_2
c     b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_1
c     b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨  b^{129, 5}_0
c  in DIMACS:
 20312 -20313  20314  516 -20315 0
 20312 -20313  20314  516 -20316 0
 20312 -20313  20314  516  20317 0

c  1-1 --> 0
c    (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0 ∧ -p_516) -> (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧ -b^{129, 5}_0)
c  in CNF:
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_2
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_1
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_0
c  in DIMACS:
 20312  20313 -20314  516 -20315 0
 20312  20313 -20314  516 -20316 0
 20312  20313 -20314  516 -20317 0

c  0-1 --> -1
c    (-b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧ -p_516) -> ( b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0)
c  in CNF:
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨  b^{129, 5}_2
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_1
c     b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨  b^{129, 5}_0
c  in DIMACS:
 20312  20313  20314  516  20315 0
 20312  20313  20314  516 -20316 0
 20312  20313  20314  516  20317 0

c  -1-1 --> -2
c    ( b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧  b^{129, 4}_0 ∧ -p_516) -> ( b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0)
c  in CNF:
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨  b^{129, 5}_2
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨  b^{129, 5}_1
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨  p_516 ∨ -b^{129, 5}_0
c  in DIMACS:
-20312  20313 -20314  516  20315 0
-20312  20313 -20314  516  20316 0
-20312  20313 -20314  516 -20317 0

c  -2-1 --> break 
c    ( b^{129, 4}_2 ∧  b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨  b^{129, 4}_0 ∨  p_516 ∨ break
c  in DIMACS:
-20312 -20313  20314  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 4}_2 ∧ -b^{129, 4}_1 ∧ -b^{129, 4}_0 ∧ true) 
c  in CNF:
c    -b^{129, 4}_2 ∨  b^{129, 4}_1 ∨  b^{129, 4}_0 ∨ false 
c  in DIMACS:
-20312  20313  20314  0

c  3 does not represent an automaton state.
c    -(-b^{129, 4}_2 ∧  b^{129, 4}_1 ∧  b^{129, 4}_0 ∧ true) 
c  in CNF:
c     b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ false 
c  in DIMACS:
 20312 -20313 -20314  0
c  -3 does not represent an automaton state.
c    -( b^{129, 4}_2 ∧  b^{129, 4}_1 ∧  b^{129, 4}_0 ∧ true) 
c  in CNF:
c    -b^{129, 4}_2 ∨ -b^{129, 4}_1 ∨ -b^{129, 4}_0 ∨ false 
c  in DIMACS:
-20312 -20313 -20314  0

c i = 5
c  -2+1 --> -1
c    ( b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧  p_645) -> ( b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0)
c  in CNF:
c    -b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨  b^{129, 6}_2
c    -b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_1
c    -b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨  b^{129, 6}_0
c  in DIMACS:
-20315 -20316  20317 -645  20318 0
-20315 -20316  20317 -645 -20319 0
-20315 -20316  20317 -645  20320 0

c  -1+1 --> 0
c    ( b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0 ∧  p_645) -> (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧ -b^{129, 6}_0)
c  in CNF:
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_2
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_1
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_0
c  in DIMACS:
-20315  20316 -20317 -645 -20318 0
-20315  20316 -20317 -645 -20319 0
-20315  20316 -20317 -645 -20320 0

c  0+1 --> 1
c    (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧  p_645) -> (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0)
c  in CNF:
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_2
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_1
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨  b^{129, 6}_0
c  in DIMACS:
 20315  20316  20317 -645 -20318 0
 20315  20316  20317 -645 -20319 0
 20315  20316  20317 -645  20320 0

c  1+1 --> 2
c    (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0 ∧  p_645) -> (-b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0)
c  in CNF:
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_2
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨  b^{129, 6}_1
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ -p_645 ∨ -b^{129, 6}_0
c  in DIMACS:
 20315  20316 -20317 -645 -20318 0
 20315  20316 -20317 -645  20319 0
 20315  20316 -20317 -645 -20320 0

c  2+1 --> break 
c    (-b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧  p_645) -> break
c  in CNF:
c     b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 20315 -20316  20317 -645 1162 0


c  2-1 --> 1
c    (-b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧ -p_645) -> (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0)
c  in CNF:
c     b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_2
c     b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_1
c     b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨  b^{129, 6}_0
c  in DIMACS:
 20315 -20316  20317  645 -20318 0
 20315 -20316  20317  645 -20319 0
 20315 -20316  20317  645  20320 0

c  1-1 --> 0
c    (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0 ∧ -p_645) -> (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧ -b^{129, 6}_0)
c  in CNF:
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_2
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_1
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_0
c  in DIMACS:
 20315  20316 -20317  645 -20318 0
 20315  20316 -20317  645 -20319 0
 20315  20316 -20317  645 -20320 0

c  0-1 --> -1
c    (-b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧ -p_645) -> ( b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0)
c  in CNF:
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨  b^{129, 6}_2
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_1
c     b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨  b^{129, 6}_0
c  in DIMACS:
 20315  20316  20317  645  20318 0
 20315  20316  20317  645 -20319 0
 20315  20316  20317  645  20320 0

c  -1-1 --> -2
c    ( b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧  b^{129, 5}_0 ∧ -p_645) -> ( b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0)
c  in CNF:
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨  b^{129, 6}_2
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨  b^{129, 6}_1
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨  p_645 ∨ -b^{129, 6}_0
c  in DIMACS:
-20315  20316 -20317  645  20318 0
-20315  20316 -20317  645  20319 0
-20315  20316 -20317  645 -20320 0

c  -2-1 --> break 
c    ( b^{129, 5}_2 ∧  b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨  b^{129, 5}_0 ∨  p_645 ∨ break
c  in DIMACS:
-20315 -20316  20317  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 5}_2 ∧ -b^{129, 5}_1 ∧ -b^{129, 5}_0 ∧ true) 
c  in CNF:
c    -b^{129, 5}_2 ∨  b^{129, 5}_1 ∨  b^{129, 5}_0 ∨ false 
c  in DIMACS:
-20315  20316  20317  0

c  3 does not represent an automaton state.
c    -(-b^{129, 5}_2 ∧  b^{129, 5}_1 ∧  b^{129, 5}_0 ∧ true) 
c  in CNF:
c     b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ false 
c  in DIMACS:
 20315 -20316 -20317  0
c  -3 does not represent an automaton state.
c    -( b^{129, 5}_2 ∧  b^{129, 5}_1 ∧  b^{129, 5}_0 ∧ true) 
c  in CNF:
c    -b^{129, 5}_2 ∨ -b^{129, 5}_1 ∨ -b^{129, 5}_0 ∨ false 
c  in DIMACS:
-20315 -20316 -20317  0

c i = 6
c  -2+1 --> -1
c    ( b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧  p_774) -> ( b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0)
c  in CNF:
c    -b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨  b^{129, 7}_2
c    -b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_1
c    -b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨  b^{129, 7}_0
c  in DIMACS:
-20318 -20319  20320 -774  20321 0
-20318 -20319  20320 -774 -20322 0
-20318 -20319  20320 -774  20323 0

c  -1+1 --> 0
c    ( b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0 ∧  p_774) -> (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧ -b^{129, 7}_0)
c  in CNF:
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_2
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_1
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_0
c  in DIMACS:
-20318  20319 -20320 -774 -20321 0
-20318  20319 -20320 -774 -20322 0
-20318  20319 -20320 -774 -20323 0

c  0+1 --> 1
c    (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧  p_774) -> (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0)
c  in CNF:
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_2
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_1
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨  b^{129, 7}_0
c  in DIMACS:
 20318  20319  20320 -774 -20321 0
 20318  20319  20320 -774 -20322 0
 20318  20319  20320 -774  20323 0

c  1+1 --> 2
c    (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0 ∧  p_774) -> (-b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0)
c  in CNF:
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_2
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨  b^{129, 7}_1
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ -p_774 ∨ -b^{129, 7}_0
c  in DIMACS:
 20318  20319 -20320 -774 -20321 0
 20318  20319 -20320 -774  20322 0
 20318  20319 -20320 -774 -20323 0

c  2+1 --> break 
c    (-b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧  p_774) -> break
c  in CNF:
c     b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 20318 -20319  20320 -774 1162 0


c  2-1 --> 1
c    (-b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧ -p_774) -> (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0)
c  in CNF:
c     b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_2
c     b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_1
c     b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨  b^{129, 7}_0
c  in DIMACS:
 20318 -20319  20320  774 -20321 0
 20318 -20319  20320  774 -20322 0
 20318 -20319  20320  774  20323 0

c  1-1 --> 0
c    (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0 ∧ -p_774) -> (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧ -b^{129, 7}_0)
c  in CNF:
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_2
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_1
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_0
c  in DIMACS:
 20318  20319 -20320  774 -20321 0
 20318  20319 -20320  774 -20322 0
 20318  20319 -20320  774 -20323 0

c  0-1 --> -1
c    (-b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧ -p_774) -> ( b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0)
c  in CNF:
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨  b^{129, 7}_2
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_1
c     b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨  b^{129, 7}_0
c  in DIMACS:
 20318  20319  20320  774  20321 0
 20318  20319  20320  774 -20322 0
 20318  20319  20320  774  20323 0

c  -1-1 --> -2
c    ( b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧  b^{129, 6}_0 ∧ -p_774) -> ( b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0)
c  in CNF:
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨  b^{129, 7}_2
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨  b^{129, 7}_1
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨  p_774 ∨ -b^{129, 7}_0
c  in DIMACS:
-20318  20319 -20320  774  20321 0
-20318  20319 -20320  774  20322 0
-20318  20319 -20320  774 -20323 0

c  -2-1 --> break 
c    ( b^{129, 6}_2 ∧  b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨  b^{129, 6}_0 ∨  p_774 ∨ break
c  in DIMACS:
-20318 -20319  20320  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 6}_2 ∧ -b^{129, 6}_1 ∧ -b^{129, 6}_0 ∧ true) 
c  in CNF:
c    -b^{129, 6}_2 ∨  b^{129, 6}_1 ∨  b^{129, 6}_0 ∨ false 
c  in DIMACS:
-20318  20319  20320  0

c  3 does not represent an automaton state.
c    -(-b^{129, 6}_2 ∧  b^{129, 6}_1 ∧  b^{129, 6}_0 ∧ true) 
c  in CNF:
c     b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ false 
c  in DIMACS:
 20318 -20319 -20320  0
c  -3 does not represent an automaton state.
c    -( b^{129, 6}_2 ∧  b^{129, 6}_1 ∧  b^{129, 6}_0 ∧ true) 
c  in CNF:
c    -b^{129, 6}_2 ∨ -b^{129, 6}_1 ∨ -b^{129, 6}_0 ∨ false 
c  in DIMACS:
-20318 -20319 -20320  0

c i = 7
c  -2+1 --> -1
c    ( b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧  p_903) -> ( b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0)
c  in CNF:
c    -b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨  b^{129, 8}_2
c    -b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_1
c    -b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨  b^{129, 8}_0
c  in DIMACS:
-20321 -20322  20323 -903  20324 0
-20321 -20322  20323 -903 -20325 0
-20321 -20322  20323 -903  20326 0

c  -1+1 --> 0
c    ( b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0 ∧  p_903) -> (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧ -b^{129, 8}_0)
c  in CNF:
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_2
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_1
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_0
c  in DIMACS:
-20321  20322 -20323 -903 -20324 0
-20321  20322 -20323 -903 -20325 0
-20321  20322 -20323 -903 -20326 0

c  0+1 --> 1
c    (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧  p_903) -> (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0)
c  in CNF:
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_2
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_1
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨  b^{129, 8}_0
c  in DIMACS:
 20321  20322  20323 -903 -20324 0
 20321  20322  20323 -903 -20325 0
 20321  20322  20323 -903  20326 0

c  1+1 --> 2
c    (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0 ∧  p_903) -> (-b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0)
c  in CNF:
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_2
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨  b^{129, 8}_1
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ -p_903 ∨ -b^{129, 8}_0
c  in DIMACS:
 20321  20322 -20323 -903 -20324 0
 20321  20322 -20323 -903  20325 0
 20321  20322 -20323 -903 -20326 0

c  2+1 --> break 
c    (-b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧  p_903) -> break
c  in CNF:
c     b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 20321 -20322  20323 -903 1162 0


c  2-1 --> 1
c    (-b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧ -p_903) -> (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0)
c  in CNF:
c     b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_2
c     b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_1
c     b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨  b^{129, 8}_0
c  in DIMACS:
 20321 -20322  20323  903 -20324 0
 20321 -20322  20323  903 -20325 0
 20321 -20322  20323  903  20326 0

c  1-1 --> 0
c    (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0 ∧ -p_903) -> (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧ -b^{129, 8}_0)
c  in CNF:
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_2
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_1
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_0
c  in DIMACS:
 20321  20322 -20323  903 -20324 0
 20321  20322 -20323  903 -20325 0
 20321  20322 -20323  903 -20326 0

c  0-1 --> -1
c    (-b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧ -p_903) -> ( b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0)
c  in CNF:
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨  b^{129, 8}_2
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_1
c     b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨  b^{129, 8}_0
c  in DIMACS:
 20321  20322  20323  903  20324 0
 20321  20322  20323  903 -20325 0
 20321  20322  20323  903  20326 0

c  -1-1 --> -2
c    ( b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧  b^{129, 7}_0 ∧ -p_903) -> ( b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0)
c  in CNF:
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨  b^{129, 8}_2
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨  b^{129, 8}_1
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨  p_903 ∨ -b^{129, 8}_0
c  in DIMACS:
-20321  20322 -20323  903  20324 0
-20321  20322 -20323  903  20325 0
-20321  20322 -20323  903 -20326 0

c  -2-1 --> break 
c    ( b^{129, 7}_2 ∧  b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨  b^{129, 7}_0 ∨  p_903 ∨ break
c  in DIMACS:
-20321 -20322  20323  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 7}_2 ∧ -b^{129, 7}_1 ∧ -b^{129, 7}_0 ∧ true) 
c  in CNF:
c    -b^{129, 7}_2 ∨  b^{129, 7}_1 ∨  b^{129, 7}_0 ∨ false 
c  in DIMACS:
-20321  20322  20323  0

c  3 does not represent an automaton state.
c    -(-b^{129, 7}_2 ∧  b^{129, 7}_1 ∧  b^{129, 7}_0 ∧ true) 
c  in CNF:
c     b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ false 
c  in DIMACS:
 20321 -20322 -20323  0
c  -3 does not represent an automaton state.
c    -( b^{129, 7}_2 ∧  b^{129, 7}_1 ∧  b^{129, 7}_0 ∧ true) 
c  in CNF:
c    -b^{129, 7}_2 ∨ -b^{129, 7}_1 ∨ -b^{129, 7}_0 ∨ false 
c  in DIMACS:
-20321 -20322 -20323  0

c i = 8
c  -2+1 --> -1
c    ( b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧  p_1032) -> ( b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0)
c  in CNF:
c    -b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨  b^{129, 9}_2
c    -b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_1
c    -b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨  b^{129, 9}_0
c  in DIMACS:
-20324 -20325  20326 -1032  20327 0
-20324 -20325  20326 -1032 -20328 0
-20324 -20325  20326 -1032  20329 0

c  -1+1 --> 0
c    ( b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0 ∧  p_1032) -> (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧ -b^{129, 9}_0)
c  in CNF:
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_2
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_1
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_0
c  in DIMACS:
-20324  20325 -20326 -1032 -20327 0
-20324  20325 -20326 -1032 -20328 0
-20324  20325 -20326 -1032 -20329 0

c  0+1 --> 1
c    (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧  p_1032) -> (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0)
c  in CNF:
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_2
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_1
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨  b^{129, 9}_0
c  in DIMACS:
 20324  20325  20326 -1032 -20327 0
 20324  20325  20326 -1032 -20328 0
 20324  20325  20326 -1032  20329 0

c  1+1 --> 2
c    (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0 ∧  p_1032) -> (-b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0)
c  in CNF:
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_2
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨  b^{129, 9}_1
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ -p_1032 ∨ -b^{129, 9}_0
c  in DIMACS:
 20324  20325 -20326 -1032 -20327 0
 20324  20325 -20326 -1032  20328 0
 20324  20325 -20326 -1032 -20329 0

c  2+1 --> break 
c    (-b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 20324 -20325  20326 -1032 1162 0


c  2-1 --> 1
c    (-b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧ -p_1032) -> (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0)
c  in CNF:
c     b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_2
c     b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_1
c     b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨  b^{129, 9}_0
c  in DIMACS:
 20324 -20325  20326  1032 -20327 0
 20324 -20325  20326  1032 -20328 0
 20324 -20325  20326  1032  20329 0

c  1-1 --> 0
c    (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0 ∧ -p_1032) -> (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧ -b^{129, 9}_0)
c  in CNF:
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_2
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_1
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_0
c  in DIMACS:
 20324  20325 -20326  1032 -20327 0
 20324  20325 -20326  1032 -20328 0
 20324  20325 -20326  1032 -20329 0

c  0-1 --> -1
c    (-b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧ -p_1032) -> ( b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0)
c  in CNF:
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨  b^{129, 9}_2
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_1
c     b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨  b^{129, 9}_0
c  in DIMACS:
 20324  20325  20326  1032  20327 0
 20324  20325  20326  1032 -20328 0
 20324  20325  20326  1032  20329 0

c  -1-1 --> -2
c    ( b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧  b^{129, 8}_0 ∧ -p_1032) -> ( b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0)
c  in CNF:
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨  b^{129, 9}_2
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨  b^{129, 9}_1
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨  p_1032 ∨ -b^{129, 9}_0
c  in DIMACS:
-20324  20325 -20326  1032  20327 0
-20324  20325 -20326  1032  20328 0
-20324  20325 -20326  1032 -20329 0

c  -2-1 --> break 
c    ( b^{129, 8}_2 ∧  b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨  b^{129, 8}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-20324 -20325  20326  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 8}_2 ∧ -b^{129, 8}_1 ∧ -b^{129, 8}_0 ∧ true) 
c  in CNF:
c    -b^{129, 8}_2 ∨  b^{129, 8}_1 ∨  b^{129, 8}_0 ∨ false 
c  in DIMACS:
-20324  20325  20326  0

c  3 does not represent an automaton state.
c    -(-b^{129, 8}_2 ∧  b^{129, 8}_1 ∧  b^{129, 8}_0 ∧ true) 
c  in CNF:
c     b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ false 
c  in DIMACS:
 20324 -20325 -20326  0
c  -3 does not represent an automaton state.
c    -( b^{129, 8}_2 ∧  b^{129, 8}_1 ∧  b^{129, 8}_0 ∧ true) 
c  in CNF:
c    -b^{129, 8}_2 ∨ -b^{129, 8}_1 ∨ -b^{129, 8}_0 ∨ false 
c  in DIMACS:
-20324 -20325 -20326  0

c i = 9
c  -2+1 --> -1
c    ( b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧  p_1161) -> ( b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧  b^{129, 10}_0)
c  in CNF:
c    -b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨  b^{129, 10}_2
c    -b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_1
c    -b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨  b^{129, 10}_0
c  in DIMACS:
-20327 -20328  20329 -1161  20330 0
-20327 -20328  20329 -1161 -20331 0
-20327 -20328  20329 -1161  20332 0

c  -1+1 --> 0
c    ( b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0 ∧  p_1161) -> (-b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧ -b^{129, 10}_0)
c  in CNF:
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_2
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_1
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_0
c  in DIMACS:
-20327  20328 -20329 -1161 -20330 0
-20327  20328 -20329 -1161 -20331 0
-20327  20328 -20329 -1161 -20332 0

c  0+1 --> 1
c    (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧  p_1161) -> (-b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧  b^{129, 10}_0)
c  in CNF:
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_2
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_1
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨  b^{129, 10}_0
c  in DIMACS:
 20327  20328  20329 -1161 -20330 0
 20327  20328  20329 -1161 -20331 0
 20327  20328  20329 -1161  20332 0

c  1+1 --> 2
c    (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0 ∧  p_1161) -> (-b^{129, 10}_2 ∧  b^{129, 10}_1 ∧ -b^{129, 10}_0)
c  in CNF:
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_2
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨  b^{129, 10}_1
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ -p_1161 ∨ -b^{129, 10}_0
c  in DIMACS:
 20327  20328 -20329 -1161 -20330 0
 20327  20328 -20329 -1161  20331 0
 20327  20328 -20329 -1161 -20332 0

c  2+1 --> break 
c    (-b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 20327 -20328  20329 -1161 1162 0


c  2-1 --> 1
c    (-b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧ -p_1161) -> (-b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧  b^{129, 10}_0)
c  in CNF:
c     b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_2
c     b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_1
c     b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨  b^{129, 10}_0
c  in DIMACS:
 20327 -20328  20329  1161 -20330 0
 20327 -20328  20329  1161 -20331 0
 20327 -20328  20329  1161  20332 0

c  1-1 --> 0
c    (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0 ∧ -p_1161) -> (-b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧ -b^{129, 10}_0)
c  in CNF:
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_2
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_1
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_0
c  in DIMACS:
 20327  20328 -20329  1161 -20330 0
 20327  20328 -20329  1161 -20331 0
 20327  20328 -20329  1161 -20332 0

c  0-1 --> -1
c    (-b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧ -p_1161) -> ( b^{129, 10}_2 ∧ -b^{129, 10}_1 ∧  b^{129, 10}_0)
c  in CNF:
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨  b^{129, 10}_2
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_1
c     b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨  b^{129, 10}_0
c  in DIMACS:
 20327  20328  20329  1161  20330 0
 20327  20328  20329  1161 -20331 0
 20327  20328  20329  1161  20332 0

c  -1-1 --> -2
c    ( b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧  b^{129, 9}_0 ∧ -p_1161) -> ( b^{129, 10}_2 ∧  b^{129, 10}_1 ∧ -b^{129, 10}_0)
c  in CNF:
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨  b^{129, 10}_2
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨  b^{129, 10}_1
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨  p_1161 ∨ -b^{129, 10}_0
c  in DIMACS:
-20327  20328 -20329  1161  20330 0
-20327  20328 -20329  1161  20331 0
-20327  20328 -20329  1161 -20332 0

c  -2-1 --> break 
c    ( b^{129, 9}_2 ∧  b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨  b^{129, 9}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-20327 -20328  20329  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{129, 9}_2 ∧ -b^{129, 9}_1 ∧ -b^{129, 9}_0 ∧ true) 
c  in CNF:
c    -b^{129, 9}_2 ∨  b^{129, 9}_1 ∨  b^{129, 9}_0 ∨ false 
c  in DIMACS:
-20327  20328  20329  0

c  3 does not represent an automaton state.
c    -(-b^{129, 9}_2 ∧  b^{129, 9}_1 ∧  b^{129, 9}_0 ∧ true) 
c  in CNF:
c     b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ false 
c  in DIMACS:
 20327 -20328 -20329  0
c  -3 does not represent an automaton state.
c    -( b^{129, 9}_2 ∧  b^{129, 9}_1 ∧  b^{129, 9}_0 ∧ true) 
c  in CNF:
c    -b^{129, 9}_2 ∨ -b^{129, 9}_1 ∨ -b^{129, 9}_0 ∨ false 
c  in DIMACS:
-20327 -20328 -20329  0

c INIT for k = 130
c    -b^{130, 1}_2
c    -b^{130, 1}_1
c    -b^{130, 1}_0
c  in DIMACS:
-20333 0
-20334 0
-20335 0

c Transitions for k = 130
c i = 1
c  -2+1 --> -1
c    ( b^{130, 1}_2 ∧  b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧  p_130) -> ( b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0)
c  in CNF:
c    -b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨  b^{130, 2}_2
c    -b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_1
c    -b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨  b^{130, 2}_0
c  in DIMACS:
-20333 -20334  20335 -130  20336 0
-20333 -20334  20335 -130 -20337 0
-20333 -20334  20335 -130  20338 0

c  -1+1 --> 0
c    ( b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧  b^{130, 1}_0 ∧  p_130) -> (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧ -b^{130, 2}_0)
c  in CNF:
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_2
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_1
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_0
c  in DIMACS:
-20333  20334 -20335 -130 -20336 0
-20333  20334 -20335 -130 -20337 0
-20333  20334 -20335 -130 -20338 0

c  0+1 --> 1
c    (-b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧  p_130) -> (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0)
c  in CNF:
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_2
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_1
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨  b^{130, 2}_0
c  in DIMACS:
 20333  20334  20335 -130 -20336 0
 20333  20334  20335 -130 -20337 0
 20333  20334  20335 -130  20338 0

c  1+1 --> 2
c    (-b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧  b^{130, 1}_0 ∧  p_130) -> (-b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0)
c  in CNF:
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_2
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨  b^{130, 2}_1
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ -p_130 ∨ -b^{130, 2}_0
c  in DIMACS:
 20333  20334 -20335 -130 -20336 0
 20333  20334 -20335 -130  20337 0
 20333  20334 -20335 -130 -20338 0

c  2+1 --> break 
c    (-b^{130, 1}_2 ∧  b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧  p_130) -> break
c  in CNF:
c     b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ -p_130 ∨ break
c  in DIMACS:
 20333 -20334  20335 -130 1162 0


c  2-1 --> 1
c    (-b^{130, 1}_2 ∧  b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧ -p_130) -> (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0)
c  in CNF:
c     b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_2
c     b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_1
c     b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨  b^{130, 2}_0
c  in DIMACS:
 20333 -20334  20335  130 -20336 0
 20333 -20334  20335  130 -20337 0
 20333 -20334  20335  130  20338 0

c  1-1 --> 0
c    (-b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧  b^{130, 1}_0 ∧ -p_130) -> (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧ -b^{130, 2}_0)
c  in CNF:
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_2
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_1
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_0
c  in DIMACS:
 20333  20334 -20335  130 -20336 0
 20333  20334 -20335  130 -20337 0
 20333  20334 -20335  130 -20338 0

c  0-1 --> -1
c    (-b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧ -p_130) -> ( b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0)
c  in CNF:
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨  b^{130, 2}_2
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_1
c     b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨  b^{130, 2}_0
c  in DIMACS:
 20333  20334  20335  130  20336 0
 20333  20334  20335  130 -20337 0
 20333  20334  20335  130  20338 0

c  -1-1 --> -2
c    ( b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧  b^{130, 1}_0 ∧ -p_130) -> ( b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0)
c  in CNF:
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨  b^{130, 2}_2
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨  b^{130, 2}_1
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨  p_130 ∨ -b^{130, 2}_0
c  in DIMACS:
-20333  20334 -20335  130  20336 0
-20333  20334 -20335  130  20337 0
-20333  20334 -20335  130 -20338 0

c  -2-1 --> break 
c    ( b^{130, 1}_2 ∧  b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧ -p_130) -> break
c  in CNF:
c    -b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨  b^{130, 1}_0 ∨  p_130 ∨ break
c  in DIMACS:
-20333 -20334  20335  130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 1}_2 ∧ -b^{130, 1}_1 ∧ -b^{130, 1}_0 ∧ true) 
c  in CNF:
c    -b^{130, 1}_2 ∨  b^{130, 1}_1 ∨  b^{130, 1}_0 ∨ false 
c  in DIMACS:
-20333  20334  20335  0

c  3 does not represent an automaton state.
c    -(-b^{130, 1}_2 ∧  b^{130, 1}_1 ∧  b^{130, 1}_0 ∧ true) 
c  in CNF:
c     b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ false 
c  in DIMACS:
 20333 -20334 -20335  0
c  -3 does not represent an automaton state.
c    -( b^{130, 1}_2 ∧  b^{130, 1}_1 ∧  b^{130, 1}_0 ∧ true) 
c  in CNF:
c    -b^{130, 1}_2 ∨ -b^{130, 1}_1 ∨ -b^{130, 1}_0 ∨ false 
c  in DIMACS:
-20333 -20334 -20335  0

c i = 2
c  -2+1 --> -1
c    ( b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧  p_260) -> ( b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0)
c  in CNF:
c    -b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨  b^{130, 3}_2
c    -b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_1
c    -b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨  b^{130, 3}_0
c  in DIMACS:
-20336 -20337  20338 -260  20339 0
-20336 -20337  20338 -260 -20340 0
-20336 -20337  20338 -260  20341 0

c  -1+1 --> 0
c    ( b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0 ∧  p_260) -> (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧ -b^{130, 3}_0)
c  in CNF:
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_2
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_1
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_0
c  in DIMACS:
-20336  20337 -20338 -260 -20339 0
-20336  20337 -20338 -260 -20340 0
-20336  20337 -20338 -260 -20341 0

c  0+1 --> 1
c    (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧  p_260) -> (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0)
c  in CNF:
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_2
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_1
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨  b^{130, 3}_0
c  in DIMACS:
 20336  20337  20338 -260 -20339 0
 20336  20337  20338 -260 -20340 0
 20336  20337  20338 -260  20341 0

c  1+1 --> 2
c    (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0 ∧  p_260) -> (-b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0)
c  in CNF:
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_2
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨  b^{130, 3}_1
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ -p_260 ∨ -b^{130, 3}_0
c  in DIMACS:
 20336  20337 -20338 -260 -20339 0
 20336  20337 -20338 -260  20340 0
 20336  20337 -20338 -260 -20341 0

c  2+1 --> break 
c    (-b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧  p_260) -> break
c  in CNF:
c     b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 20336 -20337  20338 -260 1162 0


c  2-1 --> 1
c    (-b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧ -p_260) -> (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0)
c  in CNF:
c     b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_2
c     b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_1
c     b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨  b^{130, 3}_0
c  in DIMACS:
 20336 -20337  20338  260 -20339 0
 20336 -20337  20338  260 -20340 0
 20336 -20337  20338  260  20341 0

c  1-1 --> 0
c    (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0 ∧ -p_260) -> (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧ -b^{130, 3}_0)
c  in CNF:
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_2
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_1
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_0
c  in DIMACS:
 20336  20337 -20338  260 -20339 0
 20336  20337 -20338  260 -20340 0
 20336  20337 -20338  260 -20341 0

c  0-1 --> -1
c    (-b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧ -p_260) -> ( b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0)
c  in CNF:
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨  b^{130, 3}_2
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_1
c     b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨  b^{130, 3}_0
c  in DIMACS:
 20336  20337  20338  260  20339 0
 20336  20337  20338  260 -20340 0
 20336  20337  20338  260  20341 0

c  -1-1 --> -2
c    ( b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧  b^{130, 2}_0 ∧ -p_260) -> ( b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0)
c  in CNF:
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨  b^{130, 3}_2
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨  b^{130, 3}_1
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨  p_260 ∨ -b^{130, 3}_0
c  in DIMACS:
-20336  20337 -20338  260  20339 0
-20336  20337 -20338  260  20340 0
-20336  20337 -20338  260 -20341 0

c  -2-1 --> break 
c    ( b^{130, 2}_2 ∧  b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨  b^{130, 2}_0 ∨  p_260 ∨ break
c  in DIMACS:
-20336 -20337  20338  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 2}_2 ∧ -b^{130, 2}_1 ∧ -b^{130, 2}_0 ∧ true) 
c  in CNF:
c    -b^{130, 2}_2 ∨  b^{130, 2}_1 ∨  b^{130, 2}_0 ∨ false 
c  in DIMACS:
-20336  20337  20338  0

c  3 does not represent an automaton state.
c    -(-b^{130, 2}_2 ∧  b^{130, 2}_1 ∧  b^{130, 2}_0 ∧ true) 
c  in CNF:
c     b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ false 
c  in DIMACS:
 20336 -20337 -20338  0
c  -3 does not represent an automaton state.
c    -( b^{130, 2}_2 ∧  b^{130, 2}_1 ∧  b^{130, 2}_0 ∧ true) 
c  in CNF:
c    -b^{130, 2}_2 ∨ -b^{130, 2}_1 ∨ -b^{130, 2}_0 ∨ false 
c  in DIMACS:
-20336 -20337 -20338  0

c i = 3
c  -2+1 --> -1
c    ( b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧  p_390) -> ( b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0)
c  in CNF:
c    -b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨  b^{130, 4}_2
c    -b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_1
c    -b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨  b^{130, 4}_0
c  in DIMACS:
-20339 -20340  20341 -390  20342 0
-20339 -20340  20341 -390 -20343 0
-20339 -20340  20341 -390  20344 0

c  -1+1 --> 0
c    ( b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0 ∧  p_390) -> (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧ -b^{130, 4}_0)
c  in CNF:
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_2
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_1
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_0
c  in DIMACS:
-20339  20340 -20341 -390 -20342 0
-20339  20340 -20341 -390 -20343 0
-20339  20340 -20341 -390 -20344 0

c  0+1 --> 1
c    (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧  p_390) -> (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0)
c  in CNF:
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_2
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_1
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨  b^{130, 4}_0
c  in DIMACS:
 20339  20340  20341 -390 -20342 0
 20339  20340  20341 -390 -20343 0
 20339  20340  20341 -390  20344 0

c  1+1 --> 2
c    (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0 ∧  p_390) -> (-b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0)
c  in CNF:
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_2
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨  b^{130, 4}_1
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ -p_390 ∨ -b^{130, 4}_0
c  in DIMACS:
 20339  20340 -20341 -390 -20342 0
 20339  20340 -20341 -390  20343 0
 20339  20340 -20341 -390 -20344 0

c  2+1 --> break 
c    (-b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧  p_390) -> break
c  in CNF:
c     b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 20339 -20340  20341 -390 1162 0


c  2-1 --> 1
c    (-b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧ -p_390) -> (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0)
c  in CNF:
c     b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_2
c     b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_1
c     b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨  b^{130, 4}_0
c  in DIMACS:
 20339 -20340  20341  390 -20342 0
 20339 -20340  20341  390 -20343 0
 20339 -20340  20341  390  20344 0

c  1-1 --> 0
c    (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0 ∧ -p_390) -> (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧ -b^{130, 4}_0)
c  in CNF:
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_2
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_1
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_0
c  in DIMACS:
 20339  20340 -20341  390 -20342 0
 20339  20340 -20341  390 -20343 0
 20339  20340 -20341  390 -20344 0

c  0-1 --> -1
c    (-b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧ -p_390) -> ( b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0)
c  in CNF:
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨  b^{130, 4}_2
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_1
c     b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨  b^{130, 4}_0
c  in DIMACS:
 20339  20340  20341  390  20342 0
 20339  20340  20341  390 -20343 0
 20339  20340  20341  390  20344 0

c  -1-1 --> -2
c    ( b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧  b^{130, 3}_0 ∧ -p_390) -> ( b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0)
c  in CNF:
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨  b^{130, 4}_2
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨  b^{130, 4}_1
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨  p_390 ∨ -b^{130, 4}_0
c  in DIMACS:
-20339  20340 -20341  390  20342 0
-20339  20340 -20341  390  20343 0
-20339  20340 -20341  390 -20344 0

c  -2-1 --> break 
c    ( b^{130, 3}_2 ∧  b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨  b^{130, 3}_0 ∨  p_390 ∨ break
c  in DIMACS:
-20339 -20340  20341  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 3}_2 ∧ -b^{130, 3}_1 ∧ -b^{130, 3}_0 ∧ true) 
c  in CNF:
c    -b^{130, 3}_2 ∨  b^{130, 3}_1 ∨  b^{130, 3}_0 ∨ false 
c  in DIMACS:
-20339  20340  20341  0

c  3 does not represent an automaton state.
c    -(-b^{130, 3}_2 ∧  b^{130, 3}_1 ∧  b^{130, 3}_0 ∧ true) 
c  in CNF:
c     b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ false 
c  in DIMACS:
 20339 -20340 -20341  0
c  -3 does not represent an automaton state.
c    -( b^{130, 3}_2 ∧  b^{130, 3}_1 ∧  b^{130, 3}_0 ∧ true) 
c  in CNF:
c    -b^{130, 3}_2 ∨ -b^{130, 3}_1 ∨ -b^{130, 3}_0 ∨ false 
c  in DIMACS:
-20339 -20340 -20341  0

c i = 4
c  -2+1 --> -1
c    ( b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧  p_520) -> ( b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0)
c  in CNF:
c    -b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨  b^{130, 5}_2
c    -b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_1
c    -b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨  b^{130, 5}_0
c  in DIMACS:
-20342 -20343  20344 -520  20345 0
-20342 -20343  20344 -520 -20346 0
-20342 -20343  20344 -520  20347 0

c  -1+1 --> 0
c    ( b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0 ∧  p_520) -> (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧ -b^{130, 5}_0)
c  in CNF:
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_2
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_1
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_0
c  in DIMACS:
-20342  20343 -20344 -520 -20345 0
-20342  20343 -20344 -520 -20346 0
-20342  20343 -20344 -520 -20347 0

c  0+1 --> 1
c    (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧  p_520) -> (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0)
c  in CNF:
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_2
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_1
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨  b^{130, 5}_0
c  in DIMACS:
 20342  20343  20344 -520 -20345 0
 20342  20343  20344 -520 -20346 0
 20342  20343  20344 -520  20347 0

c  1+1 --> 2
c    (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0 ∧  p_520) -> (-b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0)
c  in CNF:
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_2
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨  b^{130, 5}_1
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ -p_520 ∨ -b^{130, 5}_0
c  in DIMACS:
 20342  20343 -20344 -520 -20345 0
 20342  20343 -20344 -520  20346 0
 20342  20343 -20344 -520 -20347 0

c  2+1 --> break 
c    (-b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧  p_520) -> break
c  in CNF:
c     b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 20342 -20343  20344 -520 1162 0


c  2-1 --> 1
c    (-b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧ -p_520) -> (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0)
c  in CNF:
c     b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_2
c     b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_1
c     b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨  b^{130, 5}_0
c  in DIMACS:
 20342 -20343  20344  520 -20345 0
 20342 -20343  20344  520 -20346 0
 20342 -20343  20344  520  20347 0

c  1-1 --> 0
c    (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0 ∧ -p_520) -> (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧ -b^{130, 5}_0)
c  in CNF:
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_2
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_1
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_0
c  in DIMACS:
 20342  20343 -20344  520 -20345 0
 20342  20343 -20344  520 -20346 0
 20342  20343 -20344  520 -20347 0

c  0-1 --> -1
c    (-b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧ -p_520) -> ( b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0)
c  in CNF:
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨  b^{130, 5}_2
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_1
c     b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨  b^{130, 5}_0
c  in DIMACS:
 20342  20343  20344  520  20345 0
 20342  20343  20344  520 -20346 0
 20342  20343  20344  520  20347 0

c  -1-1 --> -2
c    ( b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧  b^{130, 4}_0 ∧ -p_520) -> ( b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0)
c  in CNF:
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨  b^{130, 5}_2
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨  b^{130, 5}_1
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨  p_520 ∨ -b^{130, 5}_0
c  in DIMACS:
-20342  20343 -20344  520  20345 0
-20342  20343 -20344  520  20346 0
-20342  20343 -20344  520 -20347 0

c  -2-1 --> break 
c    ( b^{130, 4}_2 ∧  b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨  b^{130, 4}_0 ∨  p_520 ∨ break
c  in DIMACS:
-20342 -20343  20344  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 4}_2 ∧ -b^{130, 4}_1 ∧ -b^{130, 4}_0 ∧ true) 
c  in CNF:
c    -b^{130, 4}_2 ∨  b^{130, 4}_1 ∨  b^{130, 4}_0 ∨ false 
c  in DIMACS:
-20342  20343  20344  0

c  3 does not represent an automaton state.
c    -(-b^{130, 4}_2 ∧  b^{130, 4}_1 ∧  b^{130, 4}_0 ∧ true) 
c  in CNF:
c     b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ false 
c  in DIMACS:
 20342 -20343 -20344  0
c  -3 does not represent an automaton state.
c    -( b^{130, 4}_2 ∧  b^{130, 4}_1 ∧  b^{130, 4}_0 ∧ true) 
c  in CNF:
c    -b^{130, 4}_2 ∨ -b^{130, 4}_1 ∨ -b^{130, 4}_0 ∨ false 
c  in DIMACS:
-20342 -20343 -20344  0

c i = 5
c  -2+1 --> -1
c    ( b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧  p_650) -> ( b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0)
c  in CNF:
c    -b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨  b^{130, 6}_2
c    -b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_1
c    -b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨  b^{130, 6}_0
c  in DIMACS:
-20345 -20346  20347 -650  20348 0
-20345 -20346  20347 -650 -20349 0
-20345 -20346  20347 -650  20350 0

c  -1+1 --> 0
c    ( b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0 ∧  p_650) -> (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧ -b^{130, 6}_0)
c  in CNF:
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_2
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_1
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_0
c  in DIMACS:
-20345  20346 -20347 -650 -20348 0
-20345  20346 -20347 -650 -20349 0
-20345  20346 -20347 -650 -20350 0

c  0+1 --> 1
c    (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧  p_650) -> (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0)
c  in CNF:
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_2
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_1
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨  b^{130, 6}_0
c  in DIMACS:
 20345  20346  20347 -650 -20348 0
 20345  20346  20347 -650 -20349 0
 20345  20346  20347 -650  20350 0

c  1+1 --> 2
c    (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0 ∧  p_650) -> (-b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0)
c  in CNF:
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_2
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨  b^{130, 6}_1
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ -p_650 ∨ -b^{130, 6}_0
c  in DIMACS:
 20345  20346 -20347 -650 -20348 0
 20345  20346 -20347 -650  20349 0
 20345  20346 -20347 -650 -20350 0

c  2+1 --> break 
c    (-b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧  p_650) -> break
c  in CNF:
c     b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 20345 -20346  20347 -650 1162 0


c  2-1 --> 1
c    (-b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧ -p_650) -> (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0)
c  in CNF:
c     b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_2
c     b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_1
c     b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨  b^{130, 6}_0
c  in DIMACS:
 20345 -20346  20347  650 -20348 0
 20345 -20346  20347  650 -20349 0
 20345 -20346  20347  650  20350 0

c  1-1 --> 0
c    (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0 ∧ -p_650) -> (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧ -b^{130, 6}_0)
c  in CNF:
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_2
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_1
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_0
c  in DIMACS:
 20345  20346 -20347  650 -20348 0
 20345  20346 -20347  650 -20349 0
 20345  20346 -20347  650 -20350 0

c  0-1 --> -1
c    (-b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧ -p_650) -> ( b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0)
c  in CNF:
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨  b^{130, 6}_2
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_1
c     b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨  b^{130, 6}_0
c  in DIMACS:
 20345  20346  20347  650  20348 0
 20345  20346  20347  650 -20349 0
 20345  20346  20347  650  20350 0

c  -1-1 --> -2
c    ( b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧  b^{130, 5}_0 ∧ -p_650) -> ( b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0)
c  in CNF:
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨  b^{130, 6}_2
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨  b^{130, 6}_1
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨  p_650 ∨ -b^{130, 6}_0
c  in DIMACS:
-20345  20346 -20347  650  20348 0
-20345  20346 -20347  650  20349 0
-20345  20346 -20347  650 -20350 0

c  -2-1 --> break 
c    ( b^{130, 5}_2 ∧  b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨  b^{130, 5}_0 ∨  p_650 ∨ break
c  in DIMACS:
-20345 -20346  20347  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 5}_2 ∧ -b^{130, 5}_1 ∧ -b^{130, 5}_0 ∧ true) 
c  in CNF:
c    -b^{130, 5}_2 ∨  b^{130, 5}_1 ∨  b^{130, 5}_0 ∨ false 
c  in DIMACS:
-20345  20346  20347  0

c  3 does not represent an automaton state.
c    -(-b^{130, 5}_2 ∧  b^{130, 5}_1 ∧  b^{130, 5}_0 ∧ true) 
c  in CNF:
c     b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ false 
c  in DIMACS:
 20345 -20346 -20347  0
c  -3 does not represent an automaton state.
c    -( b^{130, 5}_2 ∧  b^{130, 5}_1 ∧  b^{130, 5}_0 ∧ true) 
c  in CNF:
c    -b^{130, 5}_2 ∨ -b^{130, 5}_1 ∨ -b^{130, 5}_0 ∨ false 
c  in DIMACS:
-20345 -20346 -20347  0

c i = 6
c  -2+1 --> -1
c    ( b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧  p_780) -> ( b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0)
c  in CNF:
c    -b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨  b^{130, 7}_2
c    -b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_1
c    -b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨  b^{130, 7}_0
c  in DIMACS:
-20348 -20349  20350 -780  20351 0
-20348 -20349  20350 -780 -20352 0
-20348 -20349  20350 -780  20353 0

c  -1+1 --> 0
c    ( b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0 ∧  p_780) -> (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧ -b^{130, 7}_0)
c  in CNF:
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_2
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_1
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_0
c  in DIMACS:
-20348  20349 -20350 -780 -20351 0
-20348  20349 -20350 -780 -20352 0
-20348  20349 -20350 -780 -20353 0

c  0+1 --> 1
c    (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧  p_780) -> (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0)
c  in CNF:
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_2
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_1
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨  b^{130, 7}_0
c  in DIMACS:
 20348  20349  20350 -780 -20351 0
 20348  20349  20350 -780 -20352 0
 20348  20349  20350 -780  20353 0

c  1+1 --> 2
c    (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0 ∧  p_780) -> (-b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0)
c  in CNF:
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_2
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨  b^{130, 7}_1
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ -p_780 ∨ -b^{130, 7}_0
c  in DIMACS:
 20348  20349 -20350 -780 -20351 0
 20348  20349 -20350 -780  20352 0
 20348  20349 -20350 -780 -20353 0

c  2+1 --> break 
c    (-b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧  p_780) -> break
c  in CNF:
c     b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 20348 -20349  20350 -780 1162 0


c  2-1 --> 1
c    (-b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧ -p_780) -> (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0)
c  in CNF:
c     b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_2
c     b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_1
c     b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨  b^{130, 7}_0
c  in DIMACS:
 20348 -20349  20350  780 -20351 0
 20348 -20349  20350  780 -20352 0
 20348 -20349  20350  780  20353 0

c  1-1 --> 0
c    (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0 ∧ -p_780) -> (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧ -b^{130, 7}_0)
c  in CNF:
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_2
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_1
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_0
c  in DIMACS:
 20348  20349 -20350  780 -20351 0
 20348  20349 -20350  780 -20352 0
 20348  20349 -20350  780 -20353 0

c  0-1 --> -1
c    (-b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧ -p_780) -> ( b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0)
c  in CNF:
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨  b^{130, 7}_2
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_1
c     b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨  b^{130, 7}_0
c  in DIMACS:
 20348  20349  20350  780  20351 0
 20348  20349  20350  780 -20352 0
 20348  20349  20350  780  20353 0

c  -1-1 --> -2
c    ( b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧  b^{130, 6}_0 ∧ -p_780) -> ( b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0)
c  in CNF:
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨  b^{130, 7}_2
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨  b^{130, 7}_1
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨  p_780 ∨ -b^{130, 7}_0
c  in DIMACS:
-20348  20349 -20350  780  20351 0
-20348  20349 -20350  780  20352 0
-20348  20349 -20350  780 -20353 0

c  -2-1 --> break 
c    ( b^{130, 6}_2 ∧  b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨  b^{130, 6}_0 ∨  p_780 ∨ break
c  in DIMACS:
-20348 -20349  20350  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 6}_2 ∧ -b^{130, 6}_1 ∧ -b^{130, 6}_0 ∧ true) 
c  in CNF:
c    -b^{130, 6}_2 ∨  b^{130, 6}_1 ∨  b^{130, 6}_0 ∨ false 
c  in DIMACS:
-20348  20349  20350  0

c  3 does not represent an automaton state.
c    -(-b^{130, 6}_2 ∧  b^{130, 6}_1 ∧  b^{130, 6}_0 ∧ true) 
c  in CNF:
c     b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ false 
c  in DIMACS:
 20348 -20349 -20350  0
c  -3 does not represent an automaton state.
c    -( b^{130, 6}_2 ∧  b^{130, 6}_1 ∧  b^{130, 6}_0 ∧ true) 
c  in CNF:
c    -b^{130, 6}_2 ∨ -b^{130, 6}_1 ∨ -b^{130, 6}_0 ∨ false 
c  in DIMACS:
-20348 -20349 -20350  0

c i = 7
c  -2+1 --> -1
c    ( b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧  p_910) -> ( b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0)
c  in CNF:
c    -b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨  b^{130, 8}_2
c    -b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_1
c    -b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨  b^{130, 8}_0
c  in DIMACS:
-20351 -20352  20353 -910  20354 0
-20351 -20352  20353 -910 -20355 0
-20351 -20352  20353 -910  20356 0

c  -1+1 --> 0
c    ( b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0 ∧  p_910) -> (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧ -b^{130, 8}_0)
c  in CNF:
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_2
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_1
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_0
c  in DIMACS:
-20351  20352 -20353 -910 -20354 0
-20351  20352 -20353 -910 -20355 0
-20351  20352 -20353 -910 -20356 0

c  0+1 --> 1
c    (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧  p_910) -> (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0)
c  in CNF:
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_2
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_1
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨  b^{130, 8}_0
c  in DIMACS:
 20351  20352  20353 -910 -20354 0
 20351  20352  20353 -910 -20355 0
 20351  20352  20353 -910  20356 0

c  1+1 --> 2
c    (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0 ∧  p_910) -> (-b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0)
c  in CNF:
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_2
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨  b^{130, 8}_1
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ -p_910 ∨ -b^{130, 8}_0
c  in DIMACS:
 20351  20352 -20353 -910 -20354 0
 20351  20352 -20353 -910  20355 0
 20351  20352 -20353 -910 -20356 0

c  2+1 --> break 
c    (-b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧  p_910) -> break
c  in CNF:
c     b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 20351 -20352  20353 -910 1162 0


c  2-1 --> 1
c    (-b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧ -p_910) -> (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0)
c  in CNF:
c     b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_2
c     b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_1
c     b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨  b^{130, 8}_0
c  in DIMACS:
 20351 -20352  20353  910 -20354 0
 20351 -20352  20353  910 -20355 0
 20351 -20352  20353  910  20356 0

c  1-1 --> 0
c    (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0 ∧ -p_910) -> (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧ -b^{130, 8}_0)
c  in CNF:
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_2
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_1
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_0
c  in DIMACS:
 20351  20352 -20353  910 -20354 0
 20351  20352 -20353  910 -20355 0
 20351  20352 -20353  910 -20356 0

c  0-1 --> -1
c    (-b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧ -p_910) -> ( b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0)
c  in CNF:
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨  b^{130, 8}_2
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_1
c     b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨  b^{130, 8}_0
c  in DIMACS:
 20351  20352  20353  910  20354 0
 20351  20352  20353  910 -20355 0
 20351  20352  20353  910  20356 0

c  -1-1 --> -2
c    ( b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧  b^{130, 7}_0 ∧ -p_910) -> ( b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0)
c  in CNF:
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨  b^{130, 8}_2
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨  b^{130, 8}_1
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨  p_910 ∨ -b^{130, 8}_0
c  in DIMACS:
-20351  20352 -20353  910  20354 0
-20351  20352 -20353  910  20355 0
-20351  20352 -20353  910 -20356 0

c  -2-1 --> break 
c    ( b^{130, 7}_2 ∧  b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨  b^{130, 7}_0 ∨  p_910 ∨ break
c  in DIMACS:
-20351 -20352  20353  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 7}_2 ∧ -b^{130, 7}_1 ∧ -b^{130, 7}_0 ∧ true) 
c  in CNF:
c    -b^{130, 7}_2 ∨  b^{130, 7}_1 ∨  b^{130, 7}_0 ∨ false 
c  in DIMACS:
-20351  20352  20353  0

c  3 does not represent an automaton state.
c    -(-b^{130, 7}_2 ∧  b^{130, 7}_1 ∧  b^{130, 7}_0 ∧ true) 
c  in CNF:
c     b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ false 
c  in DIMACS:
 20351 -20352 -20353  0
c  -3 does not represent an automaton state.
c    -( b^{130, 7}_2 ∧  b^{130, 7}_1 ∧  b^{130, 7}_0 ∧ true) 
c  in CNF:
c    -b^{130, 7}_2 ∨ -b^{130, 7}_1 ∨ -b^{130, 7}_0 ∨ false 
c  in DIMACS:
-20351 -20352 -20353  0

c i = 8
c  -2+1 --> -1
c    ( b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧  p_1040) -> ( b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧  b^{130, 9}_0)
c  in CNF:
c    -b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨  b^{130, 9}_2
c    -b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_1
c    -b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨  b^{130, 9}_0
c  in DIMACS:
-20354 -20355  20356 -1040  20357 0
-20354 -20355  20356 -1040 -20358 0
-20354 -20355  20356 -1040  20359 0

c  -1+1 --> 0
c    ( b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0 ∧  p_1040) -> (-b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧ -b^{130, 9}_0)
c  in CNF:
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_2
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_1
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_0
c  in DIMACS:
-20354  20355 -20356 -1040 -20357 0
-20354  20355 -20356 -1040 -20358 0
-20354  20355 -20356 -1040 -20359 0

c  0+1 --> 1
c    (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧  p_1040) -> (-b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧  b^{130, 9}_0)
c  in CNF:
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_2
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_1
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨  b^{130, 9}_0
c  in DIMACS:
 20354  20355  20356 -1040 -20357 0
 20354  20355  20356 -1040 -20358 0
 20354  20355  20356 -1040  20359 0

c  1+1 --> 2
c    (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0 ∧  p_1040) -> (-b^{130, 9}_2 ∧  b^{130, 9}_1 ∧ -b^{130, 9}_0)
c  in CNF:
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_2
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨  b^{130, 9}_1
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ -p_1040 ∨ -b^{130, 9}_0
c  in DIMACS:
 20354  20355 -20356 -1040 -20357 0
 20354  20355 -20356 -1040  20358 0
 20354  20355 -20356 -1040 -20359 0

c  2+1 --> break 
c    (-b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 20354 -20355  20356 -1040 1162 0


c  2-1 --> 1
c    (-b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧ -p_1040) -> (-b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧  b^{130, 9}_0)
c  in CNF:
c     b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_2
c     b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_1
c     b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨  b^{130, 9}_0
c  in DIMACS:
 20354 -20355  20356  1040 -20357 0
 20354 -20355  20356  1040 -20358 0
 20354 -20355  20356  1040  20359 0

c  1-1 --> 0
c    (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0 ∧ -p_1040) -> (-b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧ -b^{130, 9}_0)
c  in CNF:
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_2
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_1
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_0
c  in DIMACS:
 20354  20355 -20356  1040 -20357 0
 20354  20355 -20356  1040 -20358 0
 20354  20355 -20356  1040 -20359 0

c  0-1 --> -1
c    (-b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧ -p_1040) -> ( b^{130, 9}_2 ∧ -b^{130, 9}_1 ∧  b^{130, 9}_0)
c  in CNF:
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨  b^{130, 9}_2
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_1
c     b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨  b^{130, 9}_0
c  in DIMACS:
 20354  20355  20356  1040  20357 0
 20354  20355  20356  1040 -20358 0
 20354  20355  20356  1040  20359 0

c  -1-1 --> -2
c    ( b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧  b^{130, 8}_0 ∧ -p_1040) -> ( b^{130, 9}_2 ∧  b^{130, 9}_1 ∧ -b^{130, 9}_0)
c  in CNF:
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨  b^{130, 9}_2
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨  b^{130, 9}_1
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨  p_1040 ∨ -b^{130, 9}_0
c  in DIMACS:
-20354  20355 -20356  1040  20357 0
-20354  20355 -20356  1040  20358 0
-20354  20355 -20356  1040 -20359 0

c  -2-1 --> break 
c    ( b^{130, 8}_2 ∧  b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨  b^{130, 8}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-20354 -20355  20356  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{130, 8}_2 ∧ -b^{130, 8}_1 ∧ -b^{130, 8}_0 ∧ true) 
c  in CNF:
c    -b^{130, 8}_2 ∨  b^{130, 8}_1 ∨  b^{130, 8}_0 ∨ false 
c  in DIMACS:
-20354  20355  20356  0

c  3 does not represent an automaton state.
c    -(-b^{130, 8}_2 ∧  b^{130, 8}_1 ∧  b^{130, 8}_0 ∧ true) 
c  in CNF:
c     b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ false 
c  in DIMACS:
 20354 -20355 -20356  0
c  -3 does not represent an automaton state.
c    -( b^{130, 8}_2 ∧  b^{130, 8}_1 ∧  b^{130, 8}_0 ∧ true) 
c  in CNF:
c    -b^{130, 8}_2 ∨ -b^{130, 8}_1 ∨ -b^{130, 8}_0 ∨ false 
c  in DIMACS:
-20354 -20355 -20356  0

c INIT for k = 131
c    -b^{131, 1}_2
c    -b^{131, 1}_1
c    -b^{131, 1}_0
c  in DIMACS:
-20360 0
-20361 0
-20362 0

c Transitions for k = 131
c i = 1
c  -2+1 --> -1
c    ( b^{131, 1}_2 ∧  b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧  p_131) -> ( b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0)
c  in CNF:
c    -b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨  b^{131, 2}_2
c    -b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_1
c    -b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨  b^{131, 2}_0
c  in DIMACS:
-20360 -20361  20362 -131  20363 0
-20360 -20361  20362 -131 -20364 0
-20360 -20361  20362 -131  20365 0

c  -1+1 --> 0
c    ( b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧  b^{131, 1}_0 ∧  p_131) -> (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧ -b^{131, 2}_0)
c  in CNF:
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_2
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_1
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_0
c  in DIMACS:
-20360  20361 -20362 -131 -20363 0
-20360  20361 -20362 -131 -20364 0
-20360  20361 -20362 -131 -20365 0

c  0+1 --> 1
c    (-b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧  p_131) -> (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0)
c  in CNF:
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_2
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_1
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨  b^{131, 2}_0
c  in DIMACS:
 20360  20361  20362 -131 -20363 0
 20360  20361  20362 -131 -20364 0
 20360  20361  20362 -131  20365 0

c  1+1 --> 2
c    (-b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧  b^{131, 1}_0 ∧  p_131) -> (-b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0)
c  in CNF:
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_2
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨  b^{131, 2}_1
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ -p_131 ∨ -b^{131, 2}_0
c  in DIMACS:
 20360  20361 -20362 -131 -20363 0
 20360  20361 -20362 -131  20364 0
 20360  20361 -20362 -131 -20365 0

c  2+1 --> break 
c    (-b^{131, 1}_2 ∧  b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧  p_131) -> break
c  in CNF:
c     b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ -p_131 ∨ break
c  in DIMACS:
 20360 -20361  20362 -131 1162 0


c  2-1 --> 1
c    (-b^{131, 1}_2 ∧  b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧ -p_131) -> (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0)
c  in CNF:
c     b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_2
c     b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_1
c     b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨  b^{131, 2}_0
c  in DIMACS:
 20360 -20361  20362  131 -20363 0
 20360 -20361  20362  131 -20364 0
 20360 -20361  20362  131  20365 0

c  1-1 --> 0
c    (-b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧  b^{131, 1}_0 ∧ -p_131) -> (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧ -b^{131, 2}_0)
c  in CNF:
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_2
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_1
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_0
c  in DIMACS:
 20360  20361 -20362  131 -20363 0
 20360  20361 -20362  131 -20364 0
 20360  20361 -20362  131 -20365 0

c  0-1 --> -1
c    (-b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧ -p_131) -> ( b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0)
c  in CNF:
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨  b^{131, 2}_2
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_1
c     b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨  b^{131, 2}_0
c  in DIMACS:
 20360  20361  20362  131  20363 0
 20360  20361  20362  131 -20364 0
 20360  20361  20362  131  20365 0

c  -1-1 --> -2
c    ( b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧  b^{131, 1}_0 ∧ -p_131) -> ( b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0)
c  in CNF:
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨  b^{131, 2}_2
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨  b^{131, 2}_1
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨  p_131 ∨ -b^{131, 2}_0
c  in DIMACS:
-20360  20361 -20362  131  20363 0
-20360  20361 -20362  131  20364 0
-20360  20361 -20362  131 -20365 0

c  -2-1 --> break 
c    ( b^{131, 1}_2 ∧  b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧ -p_131) -> break
c  in CNF:
c    -b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨  b^{131, 1}_0 ∨  p_131 ∨ break
c  in DIMACS:
-20360 -20361  20362  131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 1}_2 ∧ -b^{131, 1}_1 ∧ -b^{131, 1}_0 ∧ true) 
c  in CNF:
c    -b^{131, 1}_2 ∨  b^{131, 1}_1 ∨  b^{131, 1}_0 ∨ false 
c  in DIMACS:
-20360  20361  20362  0

c  3 does not represent an automaton state.
c    -(-b^{131, 1}_2 ∧  b^{131, 1}_1 ∧  b^{131, 1}_0 ∧ true) 
c  in CNF:
c     b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ false 
c  in DIMACS:
 20360 -20361 -20362  0
c  -3 does not represent an automaton state.
c    -( b^{131, 1}_2 ∧  b^{131, 1}_1 ∧  b^{131, 1}_0 ∧ true) 
c  in CNF:
c    -b^{131, 1}_2 ∨ -b^{131, 1}_1 ∨ -b^{131, 1}_0 ∨ false 
c  in DIMACS:
-20360 -20361 -20362  0

c i = 2
c  -2+1 --> -1
c    ( b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧  p_262) -> ( b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0)
c  in CNF:
c    -b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨  b^{131, 3}_2
c    -b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_1
c    -b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨  b^{131, 3}_0
c  in DIMACS:
-20363 -20364  20365 -262  20366 0
-20363 -20364  20365 -262 -20367 0
-20363 -20364  20365 -262  20368 0

c  -1+1 --> 0
c    ( b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0 ∧  p_262) -> (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧ -b^{131, 3}_0)
c  in CNF:
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_2
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_1
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_0
c  in DIMACS:
-20363  20364 -20365 -262 -20366 0
-20363  20364 -20365 -262 -20367 0
-20363  20364 -20365 -262 -20368 0

c  0+1 --> 1
c    (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧  p_262) -> (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0)
c  in CNF:
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_2
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_1
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨  b^{131, 3}_0
c  in DIMACS:
 20363  20364  20365 -262 -20366 0
 20363  20364  20365 -262 -20367 0
 20363  20364  20365 -262  20368 0

c  1+1 --> 2
c    (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0 ∧  p_262) -> (-b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0)
c  in CNF:
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_2
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨  b^{131, 3}_1
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ -p_262 ∨ -b^{131, 3}_0
c  in DIMACS:
 20363  20364 -20365 -262 -20366 0
 20363  20364 -20365 -262  20367 0
 20363  20364 -20365 -262 -20368 0

c  2+1 --> break 
c    (-b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧  p_262) -> break
c  in CNF:
c     b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ -p_262 ∨ break
c  in DIMACS:
 20363 -20364  20365 -262 1162 0


c  2-1 --> 1
c    (-b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧ -p_262) -> (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0)
c  in CNF:
c     b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_2
c     b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_1
c     b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨  b^{131, 3}_0
c  in DIMACS:
 20363 -20364  20365  262 -20366 0
 20363 -20364  20365  262 -20367 0
 20363 -20364  20365  262  20368 0

c  1-1 --> 0
c    (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0 ∧ -p_262) -> (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧ -b^{131, 3}_0)
c  in CNF:
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_2
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_1
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_0
c  in DIMACS:
 20363  20364 -20365  262 -20366 0
 20363  20364 -20365  262 -20367 0
 20363  20364 -20365  262 -20368 0

c  0-1 --> -1
c    (-b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧ -p_262) -> ( b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0)
c  in CNF:
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨  b^{131, 3}_2
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_1
c     b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨  b^{131, 3}_0
c  in DIMACS:
 20363  20364  20365  262  20366 0
 20363  20364  20365  262 -20367 0
 20363  20364  20365  262  20368 0

c  -1-1 --> -2
c    ( b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧  b^{131, 2}_0 ∧ -p_262) -> ( b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0)
c  in CNF:
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨  b^{131, 3}_2
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨  b^{131, 3}_1
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨  p_262 ∨ -b^{131, 3}_0
c  in DIMACS:
-20363  20364 -20365  262  20366 0
-20363  20364 -20365  262  20367 0
-20363  20364 -20365  262 -20368 0

c  -2-1 --> break 
c    ( b^{131, 2}_2 ∧  b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧ -p_262) -> break
c  in CNF:
c    -b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨  b^{131, 2}_0 ∨  p_262 ∨ break
c  in DIMACS:
-20363 -20364  20365  262 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 2}_2 ∧ -b^{131, 2}_1 ∧ -b^{131, 2}_0 ∧ true) 
c  in CNF:
c    -b^{131, 2}_2 ∨  b^{131, 2}_1 ∨  b^{131, 2}_0 ∨ false 
c  in DIMACS:
-20363  20364  20365  0

c  3 does not represent an automaton state.
c    -(-b^{131, 2}_2 ∧  b^{131, 2}_1 ∧  b^{131, 2}_0 ∧ true) 
c  in CNF:
c     b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ false 
c  in DIMACS:
 20363 -20364 -20365  0
c  -3 does not represent an automaton state.
c    -( b^{131, 2}_2 ∧  b^{131, 2}_1 ∧  b^{131, 2}_0 ∧ true) 
c  in CNF:
c    -b^{131, 2}_2 ∨ -b^{131, 2}_1 ∨ -b^{131, 2}_0 ∨ false 
c  in DIMACS:
-20363 -20364 -20365  0

c i = 3
c  -2+1 --> -1
c    ( b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧  p_393) -> ( b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0)
c  in CNF:
c    -b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨  b^{131, 4}_2
c    -b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_1
c    -b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨  b^{131, 4}_0
c  in DIMACS:
-20366 -20367  20368 -393  20369 0
-20366 -20367  20368 -393 -20370 0
-20366 -20367  20368 -393  20371 0

c  -1+1 --> 0
c    ( b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0 ∧  p_393) -> (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧ -b^{131, 4}_0)
c  in CNF:
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_2
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_1
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_0
c  in DIMACS:
-20366  20367 -20368 -393 -20369 0
-20366  20367 -20368 -393 -20370 0
-20366  20367 -20368 -393 -20371 0

c  0+1 --> 1
c    (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧  p_393) -> (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0)
c  in CNF:
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_2
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_1
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨  b^{131, 4}_0
c  in DIMACS:
 20366  20367  20368 -393 -20369 0
 20366  20367  20368 -393 -20370 0
 20366  20367  20368 -393  20371 0

c  1+1 --> 2
c    (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0 ∧  p_393) -> (-b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0)
c  in CNF:
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_2
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨  b^{131, 4}_1
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ -p_393 ∨ -b^{131, 4}_0
c  in DIMACS:
 20366  20367 -20368 -393 -20369 0
 20366  20367 -20368 -393  20370 0
 20366  20367 -20368 -393 -20371 0

c  2+1 --> break 
c    (-b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧  p_393) -> break
c  in CNF:
c     b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ -p_393 ∨ break
c  in DIMACS:
 20366 -20367  20368 -393 1162 0


c  2-1 --> 1
c    (-b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧ -p_393) -> (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0)
c  in CNF:
c     b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_2
c     b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_1
c     b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨  b^{131, 4}_0
c  in DIMACS:
 20366 -20367  20368  393 -20369 0
 20366 -20367  20368  393 -20370 0
 20366 -20367  20368  393  20371 0

c  1-1 --> 0
c    (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0 ∧ -p_393) -> (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧ -b^{131, 4}_0)
c  in CNF:
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_2
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_1
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_0
c  in DIMACS:
 20366  20367 -20368  393 -20369 0
 20366  20367 -20368  393 -20370 0
 20366  20367 -20368  393 -20371 0

c  0-1 --> -1
c    (-b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧ -p_393) -> ( b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0)
c  in CNF:
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨  b^{131, 4}_2
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_1
c     b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨  b^{131, 4}_0
c  in DIMACS:
 20366  20367  20368  393  20369 0
 20366  20367  20368  393 -20370 0
 20366  20367  20368  393  20371 0

c  -1-1 --> -2
c    ( b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧  b^{131, 3}_0 ∧ -p_393) -> ( b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0)
c  in CNF:
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨  b^{131, 4}_2
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨  b^{131, 4}_1
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨  p_393 ∨ -b^{131, 4}_0
c  in DIMACS:
-20366  20367 -20368  393  20369 0
-20366  20367 -20368  393  20370 0
-20366  20367 -20368  393 -20371 0

c  -2-1 --> break 
c    ( b^{131, 3}_2 ∧  b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧ -p_393) -> break
c  in CNF:
c    -b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨  b^{131, 3}_0 ∨  p_393 ∨ break
c  in DIMACS:
-20366 -20367  20368  393 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 3}_2 ∧ -b^{131, 3}_1 ∧ -b^{131, 3}_0 ∧ true) 
c  in CNF:
c    -b^{131, 3}_2 ∨  b^{131, 3}_1 ∨  b^{131, 3}_0 ∨ false 
c  in DIMACS:
-20366  20367  20368  0

c  3 does not represent an automaton state.
c    -(-b^{131, 3}_2 ∧  b^{131, 3}_1 ∧  b^{131, 3}_0 ∧ true) 
c  in CNF:
c     b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ false 
c  in DIMACS:
 20366 -20367 -20368  0
c  -3 does not represent an automaton state.
c    -( b^{131, 3}_2 ∧  b^{131, 3}_1 ∧  b^{131, 3}_0 ∧ true) 
c  in CNF:
c    -b^{131, 3}_2 ∨ -b^{131, 3}_1 ∨ -b^{131, 3}_0 ∨ false 
c  in DIMACS:
-20366 -20367 -20368  0

c i = 4
c  -2+1 --> -1
c    ( b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧  p_524) -> ( b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0)
c  in CNF:
c    -b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨  b^{131, 5}_2
c    -b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_1
c    -b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨  b^{131, 5}_0
c  in DIMACS:
-20369 -20370  20371 -524  20372 0
-20369 -20370  20371 -524 -20373 0
-20369 -20370  20371 -524  20374 0

c  -1+1 --> 0
c    ( b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0 ∧  p_524) -> (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧ -b^{131, 5}_0)
c  in CNF:
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_2
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_1
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_0
c  in DIMACS:
-20369  20370 -20371 -524 -20372 0
-20369  20370 -20371 -524 -20373 0
-20369  20370 -20371 -524 -20374 0

c  0+1 --> 1
c    (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧  p_524) -> (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0)
c  in CNF:
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_2
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_1
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨  b^{131, 5}_0
c  in DIMACS:
 20369  20370  20371 -524 -20372 0
 20369  20370  20371 -524 -20373 0
 20369  20370  20371 -524  20374 0

c  1+1 --> 2
c    (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0 ∧  p_524) -> (-b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0)
c  in CNF:
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_2
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨  b^{131, 5}_1
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ -p_524 ∨ -b^{131, 5}_0
c  in DIMACS:
 20369  20370 -20371 -524 -20372 0
 20369  20370 -20371 -524  20373 0
 20369  20370 -20371 -524 -20374 0

c  2+1 --> break 
c    (-b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧  p_524) -> break
c  in CNF:
c     b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ -p_524 ∨ break
c  in DIMACS:
 20369 -20370  20371 -524 1162 0


c  2-1 --> 1
c    (-b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧ -p_524) -> (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0)
c  in CNF:
c     b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_2
c     b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_1
c     b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨  b^{131, 5}_0
c  in DIMACS:
 20369 -20370  20371  524 -20372 0
 20369 -20370  20371  524 -20373 0
 20369 -20370  20371  524  20374 0

c  1-1 --> 0
c    (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0 ∧ -p_524) -> (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧ -b^{131, 5}_0)
c  in CNF:
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_2
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_1
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_0
c  in DIMACS:
 20369  20370 -20371  524 -20372 0
 20369  20370 -20371  524 -20373 0
 20369  20370 -20371  524 -20374 0

c  0-1 --> -1
c    (-b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧ -p_524) -> ( b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0)
c  in CNF:
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨  b^{131, 5}_2
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_1
c     b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨  b^{131, 5}_0
c  in DIMACS:
 20369  20370  20371  524  20372 0
 20369  20370  20371  524 -20373 0
 20369  20370  20371  524  20374 0

c  -1-1 --> -2
c    ( b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧  b^{131, 4}_0 ∧ -p_524) -> ( b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0)
c  in CNF:
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨  b^{131, 5}_2
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨  b^{131, 5}_1
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨  p_524 ∨ -b^{131, 5}_0
c  in DIMACS:
-20369  20370 -20371  524  20372 0
-20369  20370 -20371  524  20373 0
-20369  20370 -20371  524 -20374 0

c  -2-1 --> break 
c    ( b^{131, 4}_2 ∧  b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧ -p_524) -> break
c  in CNF:
c    -b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨  b^{131, 4}_0 ∨  p_524 ∨ break
c  in DIMACS:
-20369 -20370  20371  524 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 4}_2 ∧ -b^{131, 4}_1 ∧ -b^{131, 4}_0 ∧ true) 
c  in CNF:
c    -b^{131, 4}_2 ∨  b^{131, 4}_1 ∨  b^{131, 4}_0 ∨ false 
c  in DIMACS:
-20369  20370  20371  0

c  3 does not represent an automaton state.
c    -(-b^{131, 4}_2 ∧  b^{131, 4}_1 ∧  b^{131, 4}_0 ∧ true) 
c  in CNF:
c     b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ false 
c  in DIMACS:
 20369 -20370 -20371  0
c  -3 does not represent an automaton state.
c    -( b^{131, 4}_2 ∧  b^{131, 4}_1 ∧  b^{131, 4}_0 ∧ true) 
c  in CNF:
c    -b^{131, 4}_2 ∨ -b^{131, 4}_1 ∨ -b^{131, 4}_0 ∨ false 
c  in DIMACS:
-20369 -20370 -20371  0

c i = 5
c  -2+1 --> -1
c    ( b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧  p_655) -> ( b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0)
c  in CNF:
c    -b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨  b^{131, 6}_2
c    -b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_1
c    -b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨  b^{131, 6}_0
c  in DIMACS:
-20372 -20373  20374 -655  20375 0
-20372 -20373  20374 -655 -20376 0
-20372 -20373  20374 -655  20377 0

c  -1+1 --> 0
c    ( b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0 ∧  p_655) -> (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧ -b^{131, 6}_0)
c  in CNF:
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_2
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_1
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_0
c  in DIMACS:
-20372  20373 -20374 -655 -20375 0
-20372  20373 -20374 -655 -20376 0
-20372  20373 -20374 -655 -20377 0

c  0+1 --> 1
c    (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧  p_655) -> (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0)
c  in CNF:
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_2
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_1
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨  b^{131, 6}_0
c  in DIMACS:
 20372  20373  20374 -655 -20375 0
 20372  20373  20374 -655 -20376 0
 20372  20373  20374 -655  20377 0

c  1+1 --> 2
c    (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0 ∧  p_655) -> (-b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0)
c  in CNF:
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_2
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨  b^{131, 6}_1
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ -p_655 ∨ -b^{131, 6}_0
c  in DIMACS:
 20372  20373 -20374 -655 -20375 0
 20372  20373 -20374 -655  20376 0
 20372  20373 -20374 -655 -20377 0

c  2+1 --> break 
c    (-b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧  p_655) -> break
c  in CNF:
c     b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ -p_655 ∨ break
c  in DIMACS:
 20372 -20373  20374 -655 1162 0


c  2-1 --> 1
c    (-b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧ -p_655) -> (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0)
c  in CNF:
c     b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_2
c     b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_1
c     b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨  b^{131, 6}_0
c  in DIMACS:
 20372 -20373  20374  655 -20375 0
 20372 -20373  20374  655 -20376 0
 20372 -20373  20374  655  20377 0

c  1-1 --> 0
c    (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0 ∧ -p_655) -> (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧ -b^{131, 6}_0)
c  in CNF:
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_2
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_1
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_0
c  in DIMACS:
 20372  20373 -20374  655 -20375 0
 20372  20373 -20374  655 -20376 0
 20372  20373 -20374  655 -20377 0

c  0-1 --> -1
c    (-b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧ -p_655) -> ( b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0)
c  in CNF:
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨  b^{131, 6}_2
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_1
c     b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨  b^{131, 6}_0
c  in DIMACS:
 20372  20373  20374  655  20375 0
 20372  20373  20374  655 -20376 0
 20372  20373  20374  655  20377 0

c  -1-1 --> -2
c    ( b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧  b^{131, 5}_0 ∧ -p_655) -> ( b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0)
c  in CNF:
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨  b^{131, 6}_2
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨  b^{131, 6}_1
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨  p_655 ∨ -b^{131, 6}_0
c  in DIMACS:
-20372  20373 -20374  655  20375 0
-20372  20373 -20374  655  20376 0
-20372  20373 -20374  655 -20377 0

c  -2-1 --> break 
c    ( b^{131, 5}_2 ∧  b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧ -p_655) -> break
c  in CNF:
c    -b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨  b^{131, 5}_0 ∨  p_655 ∨ break
c  in DIMACS:
-20372 -20373  20374  655 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 5}_2 ∧ -b^{131, 5}_1 ∧ -b^{131, 5}_0 ∧ true) 
c  in CNF:
c    -b^{131, 5}_2 ∨  b^{131, 5}_1 ∨  b^{131, 5}_0 ∨ false 
c  in DIMACS:
-20372  20373  20374  0

c  3 does not represent an automaton state.
c    -(-b^{131, 5}_2 ∧  b^{131, 5}_1 ∧  b^{131, 5}_0 ∧ true) 
c  in CNF:
c     b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ false 
c  in DIMACS:
 20372 -20373 -20374  0
c  -3 does not represent an automaton state.
c    -( b^{131, 5}_2 ∧  b^{131, 5}_1 ∧  b^{131, 5}_0 ∧ true) 
c  in CNF:
c    -b^{131, 5}_2 ∨ -b^{131, 5}_1 ∨ -b^{131, 5}_0 ∨ false 
c  in DIMACS:
-20372 -20373 -20374  0

c i = 6
c  -2+1 --> -1
c    ( b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧  p_786) -> ( b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0)
c  in CNF:
c    -b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨  b^{131, 7}_2
c    -b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_1
c    -b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨  b^{131, 7}_0
c  in DIMACS:
-20375 -20376  20377 -786  20378 0
-20375 -20376  20377 -786 -20379 0
-20375 -20376  20377 -786  20380 0

c  -1+1 --> 0
c    ( b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0 ∧  p_786) -> (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧ -b^{131, 7}_0)
c  in CNF:
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_2
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_1
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_0
c  in DIMACS:
-20375  20376 -20377 -786 -20378 0
-20375  20376 -20377 -786 -20379 0
-20375  20376 -20377 -786 -20380 0

c  0+1 --> 1
c    (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧  p_786) -> (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0)
c  in CNF:
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_2
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_1
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨  b^{131, 7}_0
c  in DIMACS:
 20375  20376  20377 -786 -20378 0
 20375  20376  20377 -786 -20379 0
 20375  20376  20377 -786  20380 0

c  1+1 --> 2
c    (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0 ∧  p_786) -> (-b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0)
c  in CNF:
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_2
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨  b^{131, 7}_1
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ -p_786 ∨ -b^{131, 7}_0
c  in DIMACS:
 20375  20376 -20377 -786 -20378 0
 20375  20376 -20377 -786  20379 0
 20375  20376 -20377 -786 -20380 0

c  2+1 --> break 
c    (-b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧  p_786) -> break
c  in CNF:
c     b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 20375 -20376  20377 -786 1162 0


c  2-1 --> 1
c    (-b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧ -p_786) -> (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0)
c  in CNF:
c     b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_2
c     b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_1
c     b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨  b^{131, 7}_0
c  in DIMACS:
 20375 -20376  20377  786 -20378 0
 20375 -20376  20377  786 -20379 0
 20375 -20376  20377  786  20380 0

c  1-1 --> 0
c    (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0 ∧ -p_786) -> (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧ -b^{131, 7}_0)
c  in CNF:
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_2
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_1
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_0
c  in DIMACS:
 20375  20376 -20377  786 -20378 0
 20375  20376 -20377  786 -20379 0
 20375  20376 -20377  786 -20380 0

c  0-1 --> -1
c    (-b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧ -p_786) -> ( b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0)
c  in CNF:
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨  b^{131, 7}_2
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_1
c     b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨  b^{131, 7}_0
c  in DIMACS:
 20375  20376  20377  786  20378 0
 20375  20376  20377  786 -20379 0
 20375  20376  20377  786  20380 0

c  -1-1 --> -2
c    ( b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧  b^{131, 6}_0 ∧ -p_786) -> ( b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0)
c  in CNF:
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨  b^{131, 7}_2
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨  b^{131, 7}_1
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨  p_786 ∨ -b^{131, 7}_0
c  in DIMACS:
-20375  20376 -20377  786  20378 0
-20375  20376 -20377  786  20379 0
-20375  20376 -20377  786 -20380 0

c  -2-1 --> break 
c    ( b^{131, 6}_2 ∧  b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨  b^{131, 6}_0 ∨  p_786 ∨ break
c  in DIMACS:
-20375 -20376  20377  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 6}_2 ∧ -b^{131, 6}_1 ∧ -b^{131, 6}_0 ∧ true) 
c  in CNF:
c    -b^{131, 6}_2 ∨  b^{131, 6}_1 ∨  b^{131, 6}_0 ∨ false 
c  in DIMACS:
-20375  20376  20377  0

c  3 does not represent an automaton state.
c    -(-b^{131, 6}_2 ∧  b^{131, 6}_1 ∧  b^{131, 6}_0 ∧ true) 
c  in CNF:
c     b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ false 
c  in DIMACS:
 20375 -20376 -20377  0
c  -3 does not represent an automaton state.
c    -( b^{131, 6}_2 ∧  b^{131, 6}_1 ∧  b^{131, 6}_0 ∧ true) 
c  in CNF:
c    -b^{131, 6}_2 ∨ -b^{131, 6}_1 ∨ -b^{131, 6}_0 ∨ false 
c  in DIMACS:
-20375 -20376 -20377  0

c i = 7
c  -2+1 --> -1
c    ( b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧  p_917) -> ( b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0)
c  in CNF:
c    -b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨  b^{131, 8}_2
c    -b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_1
c    -b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨  b^{131, 8}_0
c  in DIMACS:
-20378 -20379  20380 -917  20381 0
-20378 -20379  20380 -917 -20382 0
-20378 -20379  20380 -917  20383 0

c  -1+1 --> 0
c    ( b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0 ∧  p_917) -> (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧ -b^{131, 8}_0)
c  in CNF:
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_2
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_1
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_0
c  in DIMACS:
-20378  20379 -20380 -917 -20381 0
-20378  20379 -20380 -917 -20382 0
-20378  20379 -20380 -917 -20383 0

c  0+1 --> 1
c    (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧  p_917) -> (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0)
c  in CNF:
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_2
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_1
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨  b^{131, 8}_0
c  in DIMACS:
 20378  20379  20380 -917 -20381 0
 20378  20379  20380 -917 -20382 0
 20378  20379  20380 -917  20383 0

c  1+1 --> 2
c    (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0 ∧  p_917) -> (-b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0)
c  in CNF:
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_2
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨  b^{131, 8}_1
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ -p_917 ∨ -b^{131, 8}_0
c  in DIMACS:
 20378  20379 -20380 -917 -20381 0
 20378  20379 -20380 -917  20382 0
 20378  20379 -20380 -917 -20383 0

c  2+1 --> break 
c    (-b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧  p_917) -> break
c  in CNF:
c     b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ -p_917 ∨ break
c  in DIMACS:
 20378 -20379  20380 -917 1162 0


c  2-1 --> 1
c    (-b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧ -p_917) -> (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0)
c  in CNF:
c     b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_2
c     b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_1
c     b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨  b^{131, 8}_0
c  in DIMACS:
 20378 -20379  20380  917 -20381 0
 20378 -20379  20380  917 -20382 0
 20378 -20379  20380  917  20383 0

c  1-1 --> 0
c    (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0 ∧ -p_917) -> (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧ -b^{131, 8}_0)
c  in CNF:
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_2
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_1
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_0
c  in DIMACS:
 20378  20379 -20380  917 -20381 0
 20378  20379 -20380  917 -20382 0
 20378  20379 -20380  917 -20383 0

c  0-1 --> -1
c    (-b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧ -p_917) -> ( b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0)
c  in CNF:
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨  b^{131, 8}_2
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_1
c     b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨  b^{131, 8}_0
c  in DIMACS:
 20378  20379  20380  917  20381 0
 20378  20379  20380  917 -20382 0
 20378  20379  20380  917  20383 0

c  -1-1 --> -2
c    ( b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧  b^{131, 7}_0 ∧ -p_917) -> ( b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0)
c  in CNF:
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨  b^{131, 8}_2
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨  b^{131, 8}_1
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨  p_917 ∨ -b^{131, 8}_0
c  in DIMACS:
-20378  20379 -20380  917  20381 0
-20378  20379 -20380  917  20382 0
-20378  20379 -20380  917 -20383 0

c  -2-1 --> break 
c    ( b^{131, 7}_2 ∧  b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧ -p_917) -> break
c  in CNF:
c    -b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨  b^{131, 7}_0 ∨  p_917 ∨ break
c  in DIMACS:
-20378 -20379  20380  917 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 7}_2 ∧ -b^{131, 7}_1 ∧ -b^{131, 7}_0 ∧ true) 
c  in CNF:
c    -b^{131, 7}_2 ∨  b^{131, 7}_1 ∨  b^{131, 7}_0 ∨ false 
c  in DIMACS:
-20378  20379  20380  0

c  3 does not represent an automaton state.
c    -(-b^{131, 7}_2 ∧  b^{131, 7}_1 ∧  b^{131, 7}_0 ∧ true) 
c  in CNF:
c     b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ false 
c  in DIMACS:
 20378 -20379 -20380  0
c  -3 does not represent an automaton state.
c    -( b^{131, 7}_2 ∧  b^{131, 7}_1 ∧  b^{131, 7}_0 ∧ true) 
c  in CNF:
c    -b^{131, 7}_2 ∨ -b^{131, 7}_1 ∨ -b^{131, 7}_0 ∨ false 
c  in DIMACS:
-20378 -20379 -20380  0

c i = 8
c  -2+1 --> -1
c    ( b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧  p_1048) -> ( b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧  b^{131, 9}_0)
c  in CNF:
c    -b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨  b^{131, 9}_2
c    -b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_1
c    -b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨  b^{131, 9}_0
c  in DIMACS:
-20381 -20382  20383 -1048  20384 0
-20381 -20382  20383 -1048 -20385 0
-20381 -20382  20383 -1048  20386 0

c  -1+1 --> 0
c    ( b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0 ∧  p_1048) -> (-b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧ -b^{131, 9}_0)
c  in CNF:
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_2
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_1
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_0
c  in DIMACS:
-20381  20382 -20383 -1048 -20384 0
-20381  20382 -20383 -1048 -20385 0
-20381  20382 -20383 -1048 -20386 0

c  0+1 --> 1
c    (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧  p_1048) -> (-b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧  b^{131, 9}_0)
c  in CNF:
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_2
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_1
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨  b^{131, 9}_0
c  in DIMACS:
 20381  20382  20383 -1048 -20384 0
 20381  20382  20383 -1048 -20385 0
 20381  20382  20383 -1048  20386 0

c  1+1 --> 2
c    (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0 ∧  p_1048) -> (-b^{131, 9}_2 ∧  b^{131, 9}_1 ∧ -b^{131, 9}_0)
c  in CNF:
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_2
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨  b^{131, 9}_1
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ -p_1048 ∨ -b^{131, 9}_0
c  in DIMACS:
 20381  20382 -20383 -1048 -20384 0
 20381  20382 -20383 -1048  20385 0
 20381  20382 -20383 -1048 -20386 0

c  2+1 --> break 
c    (-b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 20381 -20382  20383 -1048 1162 0


c  2-1 --> 1
c    (-b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧ -p_1048) -> (-b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧  b^{131, 9}_0)
c  in CNF:
c     b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_2
c     b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_1
c     b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨  b^{131, 9}_0
c  in DIMACS:
 20381 -20382  20383  1048 -20384 0
 20381 -20382  20383  1048 -20385 0
 20381 -20382  20383  1048  20386 0

c  1-1 --> 0
c    (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0 ∧ -p_1048) -> (-b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧ -b^{131, 9}_0)
c  in CNF:
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_2
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_1
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_0
c  in DIMACS:
 20381  20382 -20383  1048 -20384 0
 20381  20382 -20383  1048 -20385 0
 20381  20382 -20383  1048 -20386 0

c  0-1 --> -1
c    (-b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧ -p_1048) -> ( b^{131, 9}_2 ∧ -b^{131, 9}_1 ∧  b^{131, 9}_0)
c  in CNF:
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨  b^{131, 9}_2
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_1
c     b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨  b^{131, 9}_0
c  in DIMACS:
 20381  20382  20383  1048  20384 0
 20381  20382  20383  1048 -20385 0
 20381  20382  20383  1048  20386 0

c  -1-1 --> -2
c    ( b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧  b^{131, 8}_0 ∧ -p_1048) -> ( b^{131, 9}_2 ∧  b^{131, 9}_1 ∧ -b^{131, 9}_0)
c  in CNF:
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨  b^{131, 9}_2
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨  b^{131, 9}_1
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨  p_1048 ∨ -b^{131, 9}_0
c  in DIMACS:
-20381  20382 -20383  1048  20384 0
-20381  20382 -20383  1048  20385 0
-20381  20382 -20383  1048 -20386 0

c  -2-1 --> break 
c    ( b^{131, 8}_2 ∧  b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨  b^{131, 8}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-20381 -20382  20383  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{131, 8}_2 ∧ -b^{131, 8}_1 ∧ -b^{131, 8}_0 ∧ true) 
c  in CNF:
c    -b^{131, 8}_2 ∨  b^{131, 8}_1 ∨  b^{131, 8}_0 ∨ false 
c  in DIMACS:
-20381  20382  20383  0

c  3 does not represent an automaton state.
c    -(-b^{131, 8}_2 ∧  b^{131, 8}_1 ∧  b^{131, 8}_0 ∧ true) 
c  in CNF:
c     b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ false 
c  in DIMACS:
 20381 -20382 -20383  0
c  -3 does not represent an automaton state.
c    -( b^{131, 8}_2 ∧  b^{131, 8}_1 ∧  b^{131, 8}_0 ∧ true) 
c  in CNF:
c    -b^{131, 8}_2 ∨ -b^{131, 8}_1 ∨ -b^{131, 8}_0 ∨ false 
c  in DIMACS:
-20381 -20382 -20383  0

c INIT for k = 132
c    -b^{132, 1}_2
c    -b^{132, 1}_1
c    -b^{132, 1}_0
c  in DIMACS:
-20387 0
-20388 0
-20389 0

c Transitions for k = 132
c i = 1
c  -2+1 --> -1
c    ( b^{132, 1}_2 ∧  b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧  p_132) -> ( b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0)
c  in CNF:
c    -b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨  b^{132, 2}_2
c    -b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_1
c    -b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨  b^{132, 2}_0
c  in DIMACS:
-20387 -20388  20389 -132  20390 0
-20387 -20388  20389 -132 -20391 0
-20387 -20388  20389 -132  20392 0

c  -1+1 --> 0
c    ( b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧  b^{132, 1}_0 ∧  p_132) -> (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧ -b^{132, 2}_0)
c  in CNF:
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_2
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_1
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_0
c  in DIMACS:
-20387  20388 -20389 -132 -20390 0
-20387  20388 -20389 -132 -20391 0
-20387  20388 -20389 -132 -20392 0

c  0+1 --> 1
c    (-b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧  p_132) -> (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0)
c  in CNF:
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_2
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_1
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨  b^{132, 2}_0
c  in DIMACS:
 20387  20388  20389 -132 -20390 0
 20387  20388  20389 -132 -20391 0
 20387  20388  20389 -132  20392 0

c  1+1 --> 2
c    (-b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧  b^{132, 1}_0 ∧  p_132) -> (-b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0)
c  in CNF:
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_2
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨  b^{132, 2}_1
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ -p_132 ∨ -b^{132, 2}_0
c  in DIMACS:
 20387  20388 -20389 -132 -20390 0
 20387  20388 -20389 -132  20391 0
 20387  20388 -20389 -132 -20392 0

c  2+1 --> break 
c    (-b^{132, 1}_2 ∧  b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧  p_132) -> break
c  in CNF:
c     b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ -p_132 ∨ break
c  in DIMACS:
 20387 -20388  20389 -132 1162 0


c  2-1 --> 1
c    (-b^{132, 1}_2 ∧  b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧ -p_132) -> (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0)
c  in CNF:
c     b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_2
c     b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_1
c     b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨  b^{132, 2}_0
c  in DIMACS:
 20387 -20388  20389  132 -20390 0
 20387 -20388  20389  132 -20391 0
 20387 -20388  20389  132  20392 0

c  1-1 --> 0
c    (-b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧  b^{132, 1}_0 ∧ -p_132) -> (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧ -b^{132, 2}_0)
c  in CNF:
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_2
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_1
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_0
c  in DIMACS:
 20387  20388 -20389  132 -20390 0
 20387  20388 -20389  132 -20391 0
 20387  20388 -20389  132 -20392 0

c  0-1 --> -1
c    (-b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧ -p_132) -> ( b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0)
c  in CNF:
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨  b^{132, 2}_2
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_1
c     b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨  b^{132, 2}_0
c  in DIMACS:
 20387  20388  20389  132  20390 0
 20387  20388  20389  132 -20391 0
 20387  20388  20389  132  20392 0

c  -1-1 --> -2
c    ( b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧  b^{132, 1}_0 ∧ -p_132) -> ( b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0)
c  in CNF:
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨  b^{132, 2}_2
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨  b^{132, 2}_1
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨  p_132 ∨ -b^{132, 2}_0
c  in DIMACS:
-20387  20388 -20389  132  20390 0
-20387  20388 -20389  132  20391 0
-20387  20388 -20389  132 -20392 0

c  -2-1 --> break 
c    ( b^{132, 1}_2 ∧  b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧ -p_132) -> break
c  in CNF:
c    -b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨  b^{132, 1}_0 ∨  p_132 ∨ break
c  in DIMACS:
-20387 -20388  20389  132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 1}_2 ∧ -b^{132, 1}_1 ∧ -b^{132, 1}_0 ∧ true) 
c  in CNF:
c    -b^{132, 1}_2 ∨  b^{132, 1}_1 ∨  b^{132, 1}_0 ∨ false 
c  in DIMACS:
-20387  20388  20389  0

c  3 does not represent an automaton state.
c    -(-b^{132, 1}_2 ∧  b^{132, 1}_1 ∧  b^{132, 1}_0 ∧ true) 
c  in CNF:
c     b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ false 
c  in DIMACS:
 20387 -20388 -20389  0
c  -3 does not represent an automaton state.
c    -( b^{132, 1}_2 ∧  b^{132, 1}_1 ∧  b^{132, 1}_0 ∧ true) 
c  in CNF:
c    -b^{132, 1}_2 ∨ -b^{132, 1}_1 ∨ -b^{132, 1}_0 ∨ false 
c  in DIMACS:
-20387 -20388 -20389  0

c i = 2
c  -2+1 --> -1
c    ( b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧  p_264) -> ( b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0)
c  in CNF:
c    -b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨  b^{132, 3}_2
c    -b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_1
c    -b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨  b^{132, 3}_0
c  in DIMACS:
-20390 -20391  20392 -264  20393 0
-20390 -20391  20392 -264 -20394 0
-20390 -20391  20392 -264  20395 0

c  -1+1 --> 0
c    ( b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0 ∧  p_264) -> (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧ -b^{132, 3}_0)
c  in CNF:
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_2
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_1
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_0
c  in DIMACS:
-20390  20391 -20392 -264 -20393 0
-20390  20391 -20392 -264 -20394 0
-20390  20391 -20392 -264 -20395 0

c  0+1 --> 1
c    (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧  p_264) -> (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0)
c  in CNF:
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_2
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_1
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨  b^{132, 3}_0
c  in DIMACS:
 20390  20391  20392 -264 -20393 0
 20390  20391  20392 -264 -20394 0
 20390  20391  20392 -264  20395 0

c  1+1 --> 2
c    (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0 ∧  p_264) -> (-b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0)
c  in CNF:
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_2
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨  b^{132, 3}_1
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ -p_264 ∨ -b^{132, 3}_0
c  in DIMACS:
 20390  20391 -20392 -264 -20393 0
 20390  20391 -20392 -264  20394 0
 20390  20391 -20392 -264 -20395 0

c  2+1 --> break 
c    (-b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧  p_264) -> break
c  in CNF:
c     b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 20390 -20391  20392 -264 1162 0


c  2-1 --> 1
c    (-b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧ -p_264) -> (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0)
c  in CNF:
c     b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_2
c     b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_1
c     b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨  b^{132, 3}_0
c  in DIMACS:
 20390 -20391  20392  264 -20393 0
 20390 -20391  20392  264 -20394 0
 20390 -20391  20392  264  20395 0

c  1-1 --> 0
c    (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0 ∧ -p_264) -> (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧ -b^{132, 3}_0)
c  in CNF:
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_2
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_1
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_0
c  in DIMACS:
 20390  20391 -20392  264 -20393 0
 20390  20391 -20392  264 -20394 0
 20390  20391 -20392  264 -20395 0

c  0-1 --> -1
c    (-b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧ -p_264) -> ( b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0)
c  in CNF:
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨  b^{132, 3}_2
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_1
c     b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨  b^{132, 3}_0
c  in DIMACS:
 20390  20391  20392  264  20393 0
 20390  20391  20392  264 -20394 0
 20390  20391  20392  264  20395 0

c  -1-1 --> -2
c    ( b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧  b^{132, 2}_0 ∧ -p_264) -> ( b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0)
c  in CNF:
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨  b^{132, 3}_2
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨  b^{132, 3}_1
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨  p_264 ∨ -b^{132, 3}_0
c  in DIMACS:
-20390  20391 -20392  264  20393 0
-20390  20391 -20392  264  20394 0
-20390  20391 -20392  264 -20395 0

c  -2-1 --> break 
c    ( b^{132, 2}_2 ∧  b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨  b^{132, 2}_0 ∨  p_264 ∨ break
c  in DIMACS:
-20390 -20391  20392  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 2}_2 ∧ -b^{132, 2}_1 ∧ -b^{132, 2}_0 ∧ true) 
c  in CNF:
c    -b^{132, 2}_2 ∨  b^{132, 2}_1 ∨  b^{132, 2}_0 ∨ false 
c  in DIMACS:
-20390  20391  20392  0

c  3 does not represent an automaton state.
c    -(-b^{132, 2}_2 ∧  b^{132, 2}_1 ∧  b^{132, 2}_0 ∧ true) 
c  in CNF:
c     b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ false 
c  in DIMACS:
 20390 -20391 -20392  0
c  -3 does not represent an automaton state.
c    -( b^{132, 2}_2 ∧  b^{132, 2}_1 ∧  b^{132, 2}_0 ∧ true) 
c  in CNF:
c    -b^{132, 2}_2 ∨ -b^{132, 2}_1 ∨ -b^{132, 2}_0 ∨ false 
c  in DIMACS:
-20390 -20391 -20392  0

c i = 3
c  -2+1 --> -1
c    ( b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧  p_396) -> ( b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0)
c  in CNF:
c    -b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨  b^{132, 4}_2
c    -b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_1
c    -b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨  b^{132, 4}_0
c  in DIMACS:
-20393 -20394  20395 -396  20396 0
-20393 -20394  20395 -396 -20397 0
-20393 -20394  20395 -396  20398 0

c  -1+1 --> 0
c    ( b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0 ∧  p_396) -> (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧ -b^{132, 4}_0)
c  in CNF:
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_2
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_1
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_0
c  in DIMACS:
-20393  20394 -20395 -396 -20396 0
-20393  20394 -20395 -396 -20397 0
-20393  20394 -20395 -396 -20398 0

c  0+1 --> 1
c    (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧  p_396) -> (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0)
c  in CNF:
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_2
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_1
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨  b^{132, 4}_0
c  in DIMACS:
 20393  20394  20395 -396 -20396 0
 20393  20394  20395 -396 -20397 0
 20393  20394  20395 -396  20398 0

c  1+1 --> 2
c    (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0 ∧  p_396) -> (-b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0)
c  in CNF:
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_2
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨  b^{132, 4}_1
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ -p_396 ∨ -b^{132, 4}_0
c  in DIMACS:
 20393  20394 -20395 -396 -20396 0
 20393  20394 -20395 -396  20397 0
 20393  20394 -20395 -396 -20398 0

c  2+1 --> break 
c    (-b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧  p_396) -> break
c  in CNF:
c     b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 20393 -20394  20395 -396 1162 0


c  2-1 --> 1
c    (-b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧ -p_396) -> (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0)
c  in CNF:
c     b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_2
c     b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_1
c     b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨  b^{132, 4}_0
c  in DIMACS:
 20393 -20394  20395  396 -20396 0
 20393 -20394  20395  396 -20397 0
 20393 -20394  20395  396  20398 0

c  1-1 --> 0
c    (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0 ∧ -p_396) -> (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧ -b^{132, 4}_0)
c  in CNF:
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_2
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_1
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_0
c  in DIMACS:
 20393  20394 -20395  396 -20396 0
 20393  20394 -20395  396 -20397 0
 20393  20394 -20395  396 -20398 0

c  0-1 --> -1
c    (-b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧ -p_396) -> ( b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0)
c  in CNF:
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨  b^{132, 4}_2
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_1
c     b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨  b^{132, 4}_0
c  in DIMACS:
 20393  20394  20395  396  20396 0
 20393  20394  20395  396 -20397 0
 20393  20394  20395  396  20398 0

c  -1-1 --> -2
c    ( b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧  b^{132, 3}_0 ∧ -p_396) -> ( b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0)
c  in CNF:
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨  b^{132, 4}_2
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨  b^{132, 4}_1
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨  p_396 ∨ -b^{132, 4}_0
c  in DIMACS:
-20393  20394 -20395  396  20396 0
-20393  20394 -20395  396  20397 0
-20393  20394 -20395  396 -20398 0

c  -2-1 --> break 
c    ( b^{132, 3}_2 ∧  b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨  b^{132, 3}_0 ∨  p_396 ∨ break
c  in DIMACS:
-20393 -20394  20395  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 3}_2 ∧ -b^{132, 3}_1 ∧ -b^{132, 3}_0 ∧ true) 
c  in CNF:
c    -b^{132, 3}_2 ∨  b^{132, 3}_1 ∨  b^{132, 3}_0 ∨ false 
c  in DIMACS:
-20393  20394  20395  0

c  3 does not represent an automaton state.
c    -(-b^{132, 3}_2 ∧  b^{132, 3}_1 ∧  b^{132, 3}_0 ∧ true) 
c  in CNF:
c     b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ false 
c  in DIMACS:
 20393 -20394 -20395  0
c  -3 does not represent an automaton state.
c    -( b^{132, 3}_2 ∧  b^{132, 3}_1 ∧  b^{132, 3}_0 ∧ true) 
c  in CNF:
c    -b^{132, 3}_2 ∨ -b^{132, 3}_1 ∨ -b^{132, 3}_0 ∨ false 
c  in DIMACS:
-20393 -20394 -20395  0

c i = 4
c  -2+1 --> -1
c    ( b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧  p_528) -> ( b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0)
c  in CNF:
c    -b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨  b^{132, 5}_2
c    -b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_1
c    -b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨  b^{132, 5}_0
c  in DIMACS:
-20396 -20397  20398 -528  20399 0
-20396 -20397  20398 -528 -20400 0
-20396 -20397  20398 -528  20401 0

c  -1+1 --> 0
c    ( b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0 ∧  p_528) -> (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧ -b^{132, 5}_0)
c  in CNF:
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_2
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_1
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_0
c  in DIMACS:
-20396  20397 -20398 -528 -20399 0
-20396  20397 -20398 -528 -20400 0
-20396  20397 -20398 -528 -20401 0

c  0+1 --> 1
c    (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧  p_528) -> (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0)
c  in CNF:
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_2
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_1
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨  b^{132, 5}_0
c  in DIMACS:
 20396  20397  20398 -528 -20399 0
 20396  20397  20398 -528 -20400 0
 20396  20397  20398 -528  20401 0

c  1+1 --> 2
c    (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0 ∧  p_528) -> (-b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0)
c  in CNF:
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_2
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨  b^{132, 5}_1
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ -p_528 ∨ -b^{132, 5}_0
c  in DIMACS:
 20396  20397 -20398 -528 -20399 0
 20396  20397 -20398 -528  20400 0
 20396  20397 -20398 -528 -20401 0

c  2+1 --> break 
c    (-b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧  p_528) -> break
c  in CNF:
c     b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 20396 -20397  20398 -528 1162 0


c  2-1 --> 1
c    (-b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧ -p_528) -> (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0)
c  in CNF:
c     b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_2
c     b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_1
c     b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨  b^{132, 5}_0
c  in DIMACS:
 20396 -20397  20398  528 -20399 0
 20396 -20397  20398  528 -20400 0
 20396 -20397  20398  528  20401 0

c  1-1 --> 0
c    (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0 ∧ -p_528) -> (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧ -b^{132, 5}_0)
c  in CNF:
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_2
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_1
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_0
c  in DIMACS:
 20396  20397 -20398  528 -20399 0
 20396  20397 -20398  528 -20400 0
 20396  20397 -20398  528 -20401 0

c  0-1 --> -1
c    (-b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧ -p_528) -> ( b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0)
c  in CNF:
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨  b^{132, 5}_2
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_1
c     b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨  b^{132, 5}_0
c  in DIMACS:
 20396  20397  20398  528  20399 0
 20396  20397  20398  528 -20400 0
 20396  20397  20398  528  20401 0

c  -1-1 --> -2
c    ( b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧  b^{132, 4}_0 ∧ -p_528) -> ( b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0)
c  in CNF:
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨  b^{132, 5}_2
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨  b^{132, 5}_1
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨  p_528 ∨ -b^{132, 5}_0
c  in DIMACS:
-20396  20397 -20398  528  20399 0
-20396  20397 -20398  528  20400 0
-20396  20397 -20398  528 -20401 0

c  -2-1 --> break 
c    ( b^{132, 4}_2 ∧  b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨  b^{132, 4}_0 ∨  p_528 ∨ break
c  in DIMACS:
-20396 -20397  20398  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 4}_2 ∧ -b^{132, 4}_1 ∧ -b^{132, 4}_0 ∧ true) 
c  in CNF:
c    -b^{132, 4}_2 ∨  b^{132, 4}_1 ∨  b^{132, 4}_0 ∨ false 
c  in DIMACS:
-20396  20397  20398  0

c  3 does not represent an automaton state.
c    -(-b^{132, 4}_2 ∧  b^{132, 4}_1 ∧  b^{132, 4}_0 ∧ true) 
c  in CNF:
c     b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ false 
c  in DIMACS:
 20396 -20397 -20398  0
c  -3 does not represent an automaton state.
c    -( b^{132, 4}_2 ∧  b^{132, 4}_1 ∧  b^{132, 4}_0 ∧ true) 
c  in CNF:
c    -b^{132, 4}_2 ∨ -b^{132, 4}_1 ∨ -b^{132, 4}_0 ∨ false 
c  in DIMACS:
-20396 -20397 -20398  0

c i = 5
c  -2+1 --> -1
c    ( b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧  p_660) -> ( b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0)
c  in CNF:
c    -b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨  b^{132, 6}_2
c    -b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_1
c    -b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨  b^{132, 6}_0
c  in DIMACS:
-20399 -20400  20401 -660  20402 0
-20399 -20400  20401 -660 -20403 0
-20399 -20400  20401 -660  20404 0

c  -1+1 --> 0
c    ( b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0 ∧  p_660) -> (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧ -b^{132, 6}_0)
c  in CNF:
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_2
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_1
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_0
c  in DIMACS:
-20399  20400 -20401 -660 -20402 0
-20399  20400 -20401 -660 -20403 0
-20399  20400 -20401 -660 -20404 0

c  0+1 --> 1
c    (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧  p_660) -> (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0)
c  in CNF:
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_2
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_1
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨  b^{132, 6}_0
c  in DIMACS:
 20399  20400  20401 -660 -20402 0
 20399  20400  20401 -660 -20403 0
 20399  20400  20401 -660  20404 0

c  1+1 --> 2
c    (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0 ∧  p_660) -> (-b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0)
c  in CNF:
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_2
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨  b^{132, 6}_1
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ -p_660 ∨ -b^{132, 6}_0
c  in DIMACS:
 20399  20400 -20401 -660 -20402 0
 20399  20400 -20401 -660  20403 0
 20399  20400 -20401 -660 -20404 0

c  2+1 --> break 
c    (-b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧  p_660) -> break
c  in CNF:
c     b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 20399 -20400  20401 -660 1162 0


c  2-1 --> 1
c    (-b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧ -p_660) -> (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0)
c  in CNF:
c     b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_2
c     b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_1
c     b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨  b^{132, 6}_0
c  in DIMACS:
 20399 -20400  20401  660 -20402 0
 20399 -20400  20401  660 -20403 0
 20399 -20400  20401  660  20404 0

c  1-1 --> 0
c    (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0 ∧ -p_660) -> (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧ -b^{132, 6}_0)
c  in CNF:
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_2
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_1
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_0
c  in DIMACS:
 20399  20400 -20401  660 -20402 0
 20399  20400 -20401  660 -20403 0
 20399  20400 -20401  660 -20404 0

c  0-1 --> -1
c    (-b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧ -p_660) -> ( b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0)
c  in CNF:
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨  b^{132, 6}_2
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_1
c     b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨  b^{132, 6}_0
c  in DIMACS:
 20399  20400  20401  660  20402 0
 20399  20400  20401  660 -20403 0
 20399  20400  20401  660  20404 0

c  -1-1 --> -2
c    ( b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧  b^{132, 5}_0 ∧ -p_660) -> ( b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0)
c  in CNF:
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨  b^{132, 6}_2
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨  b^{132, 6}_1
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨  p_660 ∨ -b^{132, 6}_0
c  in DIMACS:
-20399  20400 -20401  660  20402 0
-20399  20400 -20401  660  20403 0
-20399  20400 -20401  660 -20404 0

c  -2-1 --> break 
c    ( b^{132, 5}_2 ∧  b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨  b^{132, 5}_0 ∨  p_660 ∨ break
c  in DIMACS:
-20399 -20400  20401  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 5}_2 ∧ -b^{132, 5}_1 ∧ -b^{132, 5}_0 ∧ true) 
c  in CNF:
c    -b^{132, 5}_2 ∨  b^{132, 5}_1 ∨  b^{132, 5}_0 ∨ false 
c  in DIMACS:
-20399  20400  20401  0

c  3 does not represent an automaton state.
c    -(-b^{132, 5}_2 ∧  b^{132, 5}_1 ∧  b^{132, 5}_0 ∧ true) 
c  in CNF:
c     b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ false 
c  in DIMACS:
 20399 -20400 -20401  0
c  -3 does not represent an automaton state.
c    -( b^{132, 5}_2 ∧  b^{132, 5}_1 ∧  b^{132, 5}_0 ∧ true) 
c  in CNF:
c    -b^{132, 5}_2 ∨ -b^{132, 5}_1 ∨ -b^{132, 5}_0 ∨ false 
c  in DIMACS:
-20399 -20400 -20401  0

c i = 6
c  -2+1 --> -1
c    ( b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧  p_792) -> ( b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0)
c  in CNF:
c    -b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨  b^{132, 7}_2
c    -b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_1
c    -b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨  b^{132, 7}_0
c  in DIMACS:
-20402 -20403  20404 -792  20405 0
-20402 -20403  20404 -792 -20406 0
-20402 -20403  20404 -792  20407 0

c  -1+1 --> 0
c    ( b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0 ∧  p_792) -> (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧ -b^{132, 7}_0)
c  in CNF:
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_2
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_1
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_0
c  in DIMACS:
-20402  20403 -20404 -792 -20405 0
-20402  20403 -20404 -792 -20406 0
-20402  20403 -20404 -792 -20407 0

c  0+1 --> 1
c    (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧  p_792) -> (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0)
c  in CNF:
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_2
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_1
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨  b^{132, 7}_0
c  in DIMACS:
 20402  20403  20404 -792 -20405 0
 20402  20403  20404 -792 -20406 0
 20402  20403  20404 -792  20407 0

c  1+1 --> 2
c    (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0 ∧  p_792) -> (-b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0)
c  in CNF:
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_2
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨  b^{132, 7}_1
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ -p_792 ∨ -b^{132, 7}_0
c  in DIMACS:
 20402  20403 -20404 -792 -20405 0
 20402  20403 -20404 -792  20406 0
 20402  20403 -20404 -792 -20407 0

c  2+1 --> break 
c    (-b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧  p_792) -> break
c  in CNF:
c     b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 20402 -20403  20404 -792 1162 0


c  2-1 --> 1
c    (-b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧ -p_792) -> (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0)
c  in CNF:
c     b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_2
c     b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_1
c     b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨  b^{132, 7}_0
c  in DIMACS:
 20402 -20403  20404  792 -20405 0
 20402 -20403  20404  792 -20406 0
 20402 -20403  20404  792  20407 0

c  1-1 --> 0
c    (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0 ∧ -p_792) -> (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧ -b^{132, 7}_0)
c  in CNF:
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_2
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_1
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_0
c  in DIMACS:
 20402  20403 -20404  792 -20405 0
 20402  20403 -20404  792 -20406 0
 20402  20403 -20404  792 -20407 0

c  0-1 --> -1
c    (-b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧ -p_792) -> ( b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0)
c  in CNF:
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨  b^{132, 7}_2
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_1
c     b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨  b^{132, 7}_0
c  in DIMACS:
 20402  20403  20404  792  20405 0
 20402  20403  20404  792 -20406 0
 20402  20403  20404  792  20407 0

c  -1-1 --> -2
c    ( b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧  b^{132, 6}_0 ∧ -p_792) -> ( b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0)
c  in CNF:
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨  b^{132, 7}_2
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨  b^{132, 7}_1
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨  p_792 ∨ -b^{132, 7}_0
c  in DIMACS:
-20402  20403 -20404  792  20405 0
-20402  20403 -20404  792  20406 0
-20402  20403 -20404  792 -20407 0

c  -2-1 --> break 
c    ( b^{132, 6}_2 ∧  b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨  b^{132, 6}_0 ∨  p_792 ∨ break
c  in DIMACS:
-20402 -20403  20404  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 6}_2 ∧ -b^{132, 6}_1 ∧ -b^{132, 6}_0 ∧ true) 
c  in CNF:
c    -b^{132, 6}_2 ∨  b^{132, 6}_1 ∨  b^{132, 6}_0 ∨ false 
c  in DIMACS:
-20402  20403  20404  0

c  3 does not represent an automaton state.
c    -(-b^{132, 6}_2 ∧  b^{132, 6}_1 ∧  b^{132, 6}_0 ∧ true) 
c  in CNF:
c     b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ false 
c  in DIMACS:
 20402 -20403 -20404  0
c  -3 does not represent an automaton state.
c    -( b^{132, 6}_2 ∧  b^{132, 6}_1 ∧  b^{132, 6}_0 ∧ true) 
c  in CNF:
c    -b^{132, 6}_2 ∨ -b^{132, 6}_1 ∨ -b^{132, 6}_0 ∨ false 
c  in DIMACS:
-20402 -20403 -20404  0

c i = 7
c  -2+1 --> -1
c    ( b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧  p_924) -> ( b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0)
c  in CNF:
c    -b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨  b^{132, 8}_2
c    -b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_1
c    -b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨  b^{132, 8}_0
c  in DIMACS:
-20405 -20406  20407 -924  20408 0
-20405 -20406  20407 -924 -20409 0
-20405 -20406  20407 -924  20410 0

c  -1+1 --> 0
c    ( b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0 ∧  p_924) -> (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧ -b^{132, 8}_0)
c  in CNF:
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_2
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_1
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_0
c  in DIMACS:
-20405  20406 -20407 -924 -20408 0
-20405  20406 -20407 -924 -20409 0
-20405  20406 -20407 -924 -20410 0

c  0+1 --> 1
c    (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧  p_924) -> (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0)
c  in CNF:
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_2
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_1
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨  b^{132, 8}_0
c  in DIMACS:
 20405  20406  20407 -924 -20408 0
 20405  20406  20407 -924 -20409 0
 20405  20406  20407 -924  20410 0

c  1+1 --> 2
c    (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0 ∧  p_924) -> (-b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0)
c  in CNF:
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_2
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨  b^{132, 8}_1
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ -p_924 ∨ -b^{132, 8}_0
c  in DIMACS:
 20405  20406 -20407 -924 -20408 0
 20405  20406 -20407 -924  20409 0
 20405  20406 -20407 -924 -20410 0

c  2+1 --> break 
c    (-b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧  p_924) -> break
c  in CNF:
c     b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 20405 -20406  20407 -924 1162 0


c  2-1 --> 1
c    (-b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧ -p_924) -> (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0)
c  in CNF:
c     b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_2
c     b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_1
c     b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨  b^{132, 8}_0
c  in DIMACS:
 20405 -20406  20407  924 -20408 0
 20405 -20406  20407  924 -20409 0
 20405 -20406  20407  924  20410 0

c  1-1 --> 0
c    (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0 ∧ -p_924) -> (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧ -b^{132, 8}_0)
c  in CNF:
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_2
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_1
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_0
c  in DIMACS:
 20405  20406 -20407  924 -20408 0
 20405  20406 -20407  924 -20409 0
 20405  20406 -20407  924 -20410 0

c  0-1 --> -1
c    (-b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧ -p_924) -> ( b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0)
c  in CNF:
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨  b^{132, 8}_2
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_1
c     b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨  b^{132, 8}_0
c  in DIMACS:
 20405  20406  20407  924  20408 0
 20405  20406  20407  924 -20409 0
 20405  20406  20407  924  20410 0

c  -1-1 --> -2
c    ( b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧  b^{132, 7}_0 ∧ -p_924) -> ( b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0)
c  in CNF:
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨  b^{132, 8}_2
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨  b^{132, 8}_1
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨  p_924 ∨ -b^{132, 8}_0
c  in DIMACS:
-20405  20406 -20407  924  20408 0
-20405  20406 -20407  924  20409 0
-20405  20406 -20407  924 -20410 0

c  -2-1 --> break 
c    ( b^{132, 7}_2 ∧  b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨  b^{132, 7}_0 ∨  p_924 ∨ break
c  in DIMACS:
-20405 -20406  20407  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 7}_2 ∧ -b^{132, 7}_1 ∧ -b^{132, 7}_0 ∧ true) 
c  in CNF:
c    -b^{132, 7}_2 ∨  b^{132, 7}_1 ∨  b^{132, 7}_0 ∨ false 
c  in DIMACS:
-20405  20406  20407  0

c  3 does not represent an automaton state.
c    -(-b^{132, 7}_2 ∧  b^{132, 7}_1 ∧  b^{132, 7}_0 ∧ true) 
c  in CNF:
c     b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ false 
c  in DIMACS:
 20405 -20406 -20407  0
c  -3 does not represent an automaton state.
c    -( b^{132, 7}_2 ∧  b^{132, 7}_1 ∧  b^{132, 7}_0 ∧ true) 
c  in CNF:
c    -b^{132, 7}_2 ∨ -b^{132, 7}_1 ∨ -b^{132, 7}_0 ∨ false 
c  in DIMACS:
-20405 -20406 -20407  0

c i = 8
c  -2+1 --> -1
c    ( b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧  p_1056) -> ( b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧  b^{132, 9}_0)
c  in CNF:
c    -b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨  b^{132, 9}_2
c    -b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_1
c    -b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨  b^{132, 9}_0
c  in DIMACS:
-20408 -20409  20410 -1056  20411 0
-20408 -20409  20410 -1056 -20412 0
-20408 -20409  20410 -1056  20413 0

c  -1+1 --> 0
c    ( b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0 ∧  p_1056) -> (-b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧ -b^{132, 9}_0)
c  in CNF:
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_2
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_1
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_0
c  in DIMACS:
-20408  20409 -20410 -1056 -20411 0
-20408  20409 -20410 -1056 -20412 0
-20408  20409 -20410 -1056 -20413 0

c  0+1 --> 1
c    (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧  p_1056) -> (-b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧  b^{132, 9}_0)
c  in CNF:
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_2
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_1
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨  b^{132, 9}_0
c  in DIMACS:
 20408  20409  20410 -1056 -20411 0
 20408  20409  20410 -1056 -20412 0
 20408  20409  20410 -1056  20413 0

c  1+1 --> 2
c    (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0 ∧  p_1056) -> (-b^{132, 9}_2 ∧  b^{132, 9}_1 ∧ -b^{132, 9}_0)
c  in CNF:
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_2
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨  b^{132, 9}_1
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ -p_1056 ∨ -b^{132, 9}_0
c  in DIMACS:
 20408  20409 -20410 -1056 -20411 0
 20408  20409 -20410 -1056  20412 0
 20408  20409 -20410 -1056 -20413 0

c  2+1 --> break 
c    (-b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 20408 -20409  20410 -1056 1162 0


c  2-1 --> 1
c    (-b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧ -p_1056) -> (-b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧  b^{132, 9}_0)
c  in CNF:
c     b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_2
c     b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_1
c     b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨  b^{132, 9}_0
c  in DIMACS:
 20408 -20409  20410  1056 -20411 0
 20408 -20409  20410  1056 -20412 0
 20408 -20409  20410  1056  20413 0

c  1-1 --> 0
c    (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0 ∧ -p_1056) -> (-b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧ -b^{132, 9}_0)
c  in CNF:
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_2
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_1
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_0
c  in DIMACS:
 20408  20409 -20410  1056 -20411 0
 20408  20409 -20410  1056 -20412 0
 20408  20409 -20410  1056 -20413 0

c  0-1 --> -1
c    (-b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧ -p_1056) -> ( b^{132, 9}_2 ∧ -b^{132, 9}_1 ∧  b^{132, 9}_0)
c  in CNF:
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨  b^{132, 9}_2
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_1
c     b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨  b^{132, 9}_0
c  in DIMACS:
 20408  20409  20410  1056  20411 0
 20408  20409  20410  1056 -20412 0
 20408  20409  20410  1056  20413 0

c  -1-1 --> -2
c    ( b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧  b^{132, 8}_0 ∧ -p_1056) -> ( b^{132, 9}_2 ∧  b^{132, 9}_1 ∧ -b^{132, 9}_0)
c  in CNF:
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨  b^{132, 9}_2
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨  b^{132, 9}_1
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨  p_1056 ∨ -b^{132, 9}_0
c  in DIMACS:
-20408  20409 -20410  1056  20411 0
-20408  20409 -20410  1056  20412 0
-20408  20409 -20410  1056 -20413 0

c  -2-1 --> break 
c    ( b^{132, 8}_2 ∧  b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨  b^{132, 8}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-20408 -20409  20410  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{132, 8}_2 ∧ -b^{132, 8}_1 ∧ -b^{132, 8}_0 ∧ true) 
c  in CNF:
c    -b^{132, 8}_2 ∨  b^{132, 8}_1 ∨  b^{132, 8}_0 ∨ false 
c  in DIMACS:
-20408  20409  20410  0

c  3 does not represent an automaton state.
c    -(-b^{132, 8}_2 ∧  b^{132, 8}_1 ∧  b^{132, 8}_0 ∧ true) 
c  in CNF:
c     b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ false 
c  in DIMACS:
 20408 -20409 -20410  0
c  -3 does not represent an automaton state.
c    -( b^{132, 8}_2 ∧  b^{132, 8}_1 ∧  b^{132, 8}_0 ∧ true) 
c  in CNF:
c    -b^{132, 8}_2 ∨ -b^{132, 8}_1 ∨ -b^{132, 8}_0 ∨ false 
c  in DIMACS:
-20408 -20409 -20410  0

c INIT for k = 133
c    -b^{133, 1}_2
c    -b^{133, 1}_1
c    -b^{133, 1}_0
c  in DIMACS:
-20414 0
-20415 0
-20416 0

c Transitions for k = 133
c i = 1
c  -2+1 --> -1
c    ( b^{133, 1}_2 ∧  b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧  p_133) -> ( b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0)
c  in CNF:
c    -b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨  b^{133, 2}_2
c    -b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_1
c    -b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨  b^{133, 2}_0
c  in DIMACS:
-20414 -20415  20416 -133  20417 0
-20414 -20415  20416 -133 -20418 0
-20414 -20415  20416 -133  20419 0

c  -1+1 --> 0
c    ( b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧  b^{133, 1}_0 ∧  p_133) -> (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧ -b^{133, 2}_0)
c  in CNF:
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_2
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_1
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_0
c  in DIMACS:
-20414  20415 -20416 -133 -20417 0
-20414  20415 -20416 -133 -20418 0
-20414  20415 -20416 -133 -20419 0

c  0+1 --> 1
c    (-b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧  p_133) -> (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0)
c  in CNF:
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_2
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_1
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨  b^{133, 2}_0
c  in DIMACS:
 20414  20415  20416 -133 -20417 0
 20414  20415  20416 -133 -20418 0
 20414  20415  20416 -133  20419 0

c  1+1 --> 2
c    (-b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧  b^{133, 1}_0 ∧  p_133) -> (-b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0)
c  in CNF:
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_2
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨  b^{133, 2}_1
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ -p_133 ∨ -b^{133, 2}_0
c  in DIMACS:
 20414  20415 -20416 -133 -20417 0
 20414  20415 -20416 -133  20418 0
 20414  20415 -20416 -133 -20419 0

c  2+1 --> break 
c    (-b^{133, 1}_2 ∧  b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧  p_133) -> break
c  in CNF:
c     b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ -p_133 ∨ break
c  in DIMACS:
 20414 -20415  20416 -133 1162 0


c  2-1 --> 1
c    (-b^{133, 1}_2 ∧  b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧ -p_133) -> (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0)
c  in CNF:
c     b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_2
c     b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_1
c     b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨  b^{133, 2}_0
c  in DIMACS:
 20414 -20415  20416  133 -20417 0
 20414 -20415  20416  133 -20418 0
 20414 -20415  20416  133  20419 0

c  1-1 --> 0
c    (-b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧  b^{133, 1}_0 ∧ -p_133) -> (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧ -b^{133, 2}_0)
c  in CNF:
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_2
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_1
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_0
c  in DIMACS:
 20414  20415 -20416  133 -20417 0
 20414  20415 -20416  133 -20418 0
 20414  20415 -20416  133 -20419 0

c  0-1 --> -1
c    (-b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧ -p_133) -> ( b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0)
c  in CNF:
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨  b^{133, 2}_2
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_1
c     b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨  b^{133, 2}_0
c  in DIMACS:
 20414  20415  20416  133  20417 0
 20414  20415  20416  133 -20418 0
 20414  20415  20416  133  20419 0

c  -1-1 --> -2
c    ( b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧  b^{133, 1}_0 ∧ -p_133) -> ( b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0)
c  in CNF:
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨  b^{133, 2}_2
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨  b^{133, 2}_1
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨  p_133 ∨ -b^{133, 2}_0
c  in DIMACS:
-20414  20415 -20416  133  20417 0
-20414  20415 -20416  133  20418 0
-20414  20415 -20416  133 -20419 0

c  -2-1 --> break 
c    ( b^{133, 1}_2 ∧  b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧ -p_133) -> break
c  in CNF:
c    -b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨  b^{133, 1}_0 ∨  p_133 ∨ break
c  in DIMACS:
-20414 -20415  20416  133 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 1}_2 ∧ -b^{133, 1}_1 ∧ -b^{133, 1}_0 ∧ true) 
c  in CNF:
c    -b^{133, 1}_2 ∨  b^{133, 1}_1 ∨  b^{133, 1}_0 ∨ false 
c  in DIMACS:
-20414  20415  20416  0

c  3 does not represent an automaton state.
c    -(-b^{133, 1}_2 ∧  b^{133, 1}_1 ∧  b^{133, 1}_0 ∧ true) 
c  in CNF:
c     b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ false 
c  in DIMACS:
 20414 -20415 -20416  0
c  -3 does not represent an automaton state.
c    -( b^{133, 1}_2 ∧  b^{133, 1}_1 ∧  b^{133, 1}_0 ∧ true) 
c  in CNF:
c    -b^{133, 1}_2 ∨ -b^{133, 1}_1 ∨ -b^{133, 1}_0 ∨ false 
c  in DIMACS:
-20414 -20415 -20416  0

c i = 2
c  -2+1 --> -1
c    ( b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧  p_266) -> ( b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0)
c  in CNF:
c    -b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨  b^{133, 3}_2
c    -b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_1
c    -b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨  b^{133, 3}_0
c  in DIMACS:
-20417 -20418  20419 -266  20420 0
-20417 -20418  20419 -266 -20421 0
-20417 -20418  20419 -266  20422 0

c  -1+1 --> 0
c    ( b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0 ∧  p_266) -> (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧ -b^{133, 3}_0)
c  in CNF:
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_2
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_1
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_0
c  in DIMACS:
-20417  20418 -20419 -266 -20420 0
-20417  20418 -20419 -266 -20421 0
-20417  20418 -20419 -266 -20422 0

c  0+1 --> 1
c    (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧  p_266) -> (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0)
c  in CNF:
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_2
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_1
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨  b^{133, 3}_0
c  in DIMACS:
 20417  20418  20419 -266 -20420 0
 20417  20418  20419 -266 -20421 0
 20417  20418  20419 -266  20422 0

c  1+1 --> 2
c    (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0 ∧  p_266) -> (-b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0)
c  in CNF:
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_2
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨  b^{133, 3}_1
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ -p_266 ∨ -b^{133, 3}_0
c  in DIMACS:
 20417  20418 -20419 -266 -20420 0
 20417  20418 -20419 -266  20421 0
 20417  20418 -20419 -266 -20422 0

c  2+1 --> break 
c    (-b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧  p_266) -> break
c  in CNF:
c     b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 20417 -20418  20419 -266 1162 0


c  2-1 --> 1
c    (-b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧ -p_266) -> (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0)
c  in CNF:
c     b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_2
c     b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_1
c     b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨  b^{133, 3}_0
c  in DIMACS:
 20417 -20418  20419  266 -20420 0
 20417 -20418  20419  266 -20421 0
 20417 -20418  20419  266  20422 0

c  1-1 --> 0
c    (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0 ∧ -p_266) -> (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧ -b^{133, 3}_0)
c  in CNF:
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_2
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_1
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_0
c  in DIMACS:
 20417  20418 -20419  266 -20420 0
 20417  20418 -20419  266 -20421 0
 20417  20418 -20419  266 -20422 0

c  0-1 --> -1
c    (-b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧ -p_266) -> ( b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0)
c  in CNF:
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨  b^{133, 3}_2
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_1
c     b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨  b^{133, 3}_0
c  in DIMACS:
 20417  20418  20419  266  20420 0
 20417  20418  20419  266 -20421 0
 20417  20418  20419  266  20422 0

c  -1-1 --> -2
c    ( b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧  b^{133, 2}_0 ∧ -p_266) -> ( b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0)
c  in CNF:
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨  b^{133, 3}_2
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨  b^{133, 3}_1
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨  p_266 ∨ -b^{133, 3}_0
c  in DIMACS:
-20417  20418 -20419  266  20420 0
-20417  20418 -20419  266  20421 0
-20417  20418 -20419  266 -20422 0

c  -2-1 --> break 
c    ( b^{133, 2}_2 ∧  b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨  b^{133, 2}_0 ∨  p_266 ∨ break
c  in DIMACS:
-20417 -20418  20419  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 2}_2 ∧ -b^{133, 2}_1 ∧ -b^{133, 2}_0 ∧ true) 
c  in CNF:
c    -b^{133, 2}_2 ∨  b^{133, 2}_1 ∨  b^{133, 2}_0 ∨ false 
c  in DIMACS:
-20417  20418  20419  0

c  3 does not represent an automaton state.
c    -(-b^{133, 2}_2 ∧  b^{133, 2}_1 ∧  b^{133, 2}_0 ∧ true) 
c  in CNF:
c     b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ false 
c  in DIMACS:
 20417 -20418 -20419  0
c  -3 does not represent an automaton state.
c    -( b^{133, 2}_2 ∧  b^{133, 2}_1 ∧  b^{133, 2}_0 ∧ true) 
c  in CNF:
c    -b^{133, 2}_2 ∨ -b^{133, 2}_1 ∨ -b^{133, 2}_0 ∨ false 
c  in DIMACS:
-20417 -20418 -20419  0

c i = 3
c  -2+1 --> -1
c    ( b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧  p_399) -> ( b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0)
c  in CNF:
c    -b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨  b^{133, 4}_2
c    -b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_1
c    -b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨  b^{133, 4}_0
c  in DIMACS:
-20420 -20421  20422 -399  20423 0
-20420 -20421  20422 -399 -20424 0
-20420 -20421  20422 -399  20425 0

c  -1+1 --> 0
c    ( b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0 ∧  p_399) -> (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧ -b^{133, 4}_0)
c  in CNF:
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_2
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_1
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_0
c  in DIMACS:
-20420  20421 -20422 -399 -20423 0
-20420  20421 -20422 -399 -20424 0
-20420  20421 -20422 -399 -20425 0

c  0+1 --> 1
c    (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧  p_399) -> (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0)
c  in CNF:
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_2
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_1
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨  b^{133, 4}_0
c  in DIMACS:
 20420  20421  20422 -399 -20423 0
 20420  20421  20422 -399 -20424 0
 20420  20421  20422 -399  20425 0

c  1+1 --> 2
c    (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0 ∧  p_399) -> (-b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0)
c  in CNF:
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_2
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨  b^{133, 4}_1
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ -p_399 ∨ -b^{133, 4}_0
c  in DIMACS:
 20420  20421 -20422 -399 -20423 0
 20420  20421 -20422 -399  20424 0
 20420  20421 -20422 -399 -20425 0

c  2+1 --> break 
c    (-b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧  p_399) -> break
c  in CNF:
c     b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ -p_399 ∨ break
c  in DIMACS:
 20420 -20421  20422 -399 1162 0


c  2-1 --> 1
c    (-b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧ -p_399) -> (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0)
c  in CNF:
c     b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_2
c     b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_1
c     b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨  b^{133, 4}_0
c  in DIMACS:
 20420 -20421  20422  399 -20423 0
 20420 -20421  20422  399 -20424 0
 20420 -20421  20422  399  20425 0

c  1-1 --> 0
c    (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0 ∧ -p_399) -> (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧ -b^{133, 4}_0)
c  in CNF:
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_2
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_1
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_0
c  in DIMACS:
 20420  20421 -20422  399 -20423 0
 20420  20421 -20422  399 -20424 0
 20420  20421 -20422  399 -20425 0

c  0-1 --> -1
c    (-b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧ -p_399) -> ( b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0)
c  in CNF:
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨  b^{133, 4}_2
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_1
c     b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨  b^{133, 4}_0
c  in DIMACS:
 20420  20421  20422  399  20423 0
 20420  20421  20422  399 -20424 0
 20420  20421  20422  399  20425 0

c  -1-1 --> -2
c    ( b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧  b^{133, 3}_0 ∧ -p_399) -> ( b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0)
c  in CNF:
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨  b^{133, 4}_2
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨  b^{133, 4}_1
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨  p_399 ∨ -b^{133, 4}_0
c  in DIMACS:
-20420  20421 -20422  399  20423 0
-20420  20421 -20422  399  20424 0
-20420  20421 -20422  399 -20425 0

c  -2-1 --> break 
c    ( b^{133, 3}_2 ∧  b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧ -p_399) -> break
c  in CNF:
c    -b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨  b^{133, 3}_0 ∨  p_399 ∨ break
c  in DIMACS:
-20420 -20421  20422  399 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 3}_2 ∧ -b^{133, 3}_1 ∧ -b^{133, 3}_0 ∧ true) 
c  in CNF:
c    -b^{133, 3}_2 ∨  b^{133, 3}_1 ∨  b^{133, 3}_0 ∨ false 
c  in DIMACS:
-20420  20421  20422  0

c  3 does not represent an automaton state.
c    -(-b^{133, 3}_2 ∧  b^{133, 3}_1 ∧  b^{133, 3}_0 ∧ true) 
c  in CNF:
c     b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ false 
c  in DIMACS:
 20420 -20421 -20422  0
c  -3 does not represent an automaton state.
c    -( b^{133, 3}_2 ∧  b^{133, 3}_1 ∧  b^{133, 3}_0 ∧ true) 
c  in CNF:
c    -b^{133, 3}_2 ∨ -b^{133, 3}_1 ∨ -b^{133, 3}_0 ∨ false 
c  in DIMACS:
-20420 -20421 -20422  0

c i = 4
c  -2+1 --> -1
c    ( b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧  p_532) -> ( b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0)
c  in CNF:
c    -b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨  b^{133, 5}_2
c    -b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_1
c    -b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨  b^{133, 5}_0
c  in DIMACS:
-20423 -20424  20425 -532  20426 0
-20423 -20424  20425 -532 -20427 0
-20423 -20424  20425 -532  20428 0

c  -1+1 --> 0
c    ( b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0 ∧  p_532) -> (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧ -b^{133, 5}_0)
c  in CNF:
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_2
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_1
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_0
c  in DIMACS:
-20423  20424 -20425 -532 -20426 0
-20423  20424 -20425 -532 -20427 0
-20423  20424 -20425 -532 -20428 0

c  0+1 --> 1
c    (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧  p_532) -> (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0)
c  in CNF:
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_2
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_1
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨  b^{133, 5}_0
c  in DIMACS:
 20423  20424  20425 -532 -20426 0
 20423  20424  20425 -532 -20427 0
 20423  20424  20425 -532  20428 0

c  1+1 --> 2
c    (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0 ∧  p_532) -> (-b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0)
c  in CNF:
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_2
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨  b^{133, 5}_1
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ -p_532 ∨ -b^{133, 5}_0
c  in DIMACS:
 20423  20424 -20425 -532 -20426 0
 20423  20424 -20425 -532  20427 0
 20423  20424 -20425 -532 -20428 0

c  2+1 --> break 
c    (-b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧  p_532) -> break
c  in CNF:
c     b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 20423 -20424  20425 -532 1162 0


c  2-1 --> 1
c    (-b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧ -p_532) -> (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0)
c  in CNF:
c     b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_2
c     b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_1
c     b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨  b^{133, 5}_0
c  in DIMACS:
 20423 -20424  20425  532 -20426 0
 20423 -20424  20425  532 -20427 0
 20423 -20424  20425  532  20428 0

c  1-1 --> 0
c    (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0 ∧ -p_532) -> (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧ -b^{133, 5}_0)
c  in CNF:
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_2
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_1
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_0
c  in DIMACS:
 20423  20424 -20425  532 -20426 0
 20423  20424 -20425  532 -20427 0
 20423  20424 -20425  532 -20428 0

c  0-1 --> -1
c    (-b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧ -p_532) -> ( b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0)
c  in CNF:
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨  b^{133, 5}_2
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_1
c     b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨  b^{133, 5}_0
c  in DIMACS:
 20423  20424  20425  532  20426 0
 20423  20424  20425  532 -20427 0
 20423  20424  20425  532  20428 0

c  -1-1 --> -2
c    ( b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧  b^{133, 4}_0 ∧ -p_532) -> ( b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0)
c  in CNF:
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨  b^{133, 5}_2
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨  b^{133, 5}_1
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨  p_532 ∨ -b^{133, 5}_0
c  in DIMACS:
-20423  20424 -20425  532  20426 0
-20423  20424 -20425  532  20427 0
-20423  20424 -20425  532 -20428 0

c  -2-1 --> break 
c    ( b^{133, 4}_2 ∧  b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨  b^{133, 4}_0 ∨  p_532 ∨ break
c  in DIMACS:
-20423 -20424  20425  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 4}_2 ∧ -b^{133, 4}_1 ∧ -b^{133, 4}_0 ∧ true) 
c  in CNF:
c    -b^{133, 4}_2 ∨  b^{133, 4}_1 ∨  b^{133, 4}_0 ∨ false 
c  in DIMACS:
-20423  20424  20425  0

c  3 does not represent an automaton state.
c    -(-b^{133, 4}_2 ∧  b^{133, 4}_1 ∧  b^{133, 4}_0 ∧ true) 
c  in CNF:
c     b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ false 
c  in DIMACS:
 20423 -20424 -20425  0
c  -3 does not represent an automaton state.
c    -( b^{133, 4}_2 ∧  b^{133, 4}_1 ∧  b^{133, 4}_0 ∧ true) 
c  in CNF:
c    -b^{133, 4}_2 ∨ -b^{133, 4}_1 ∨ -b^{133, 4}_0 ∨ false 
c  in DIMACS:
-20423 -20424 -20425  0

c i = 5
c  -2+1 --> -1
c    ( b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧  p_665) -> ( b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0)
c  in CNF:
c    -b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨  b^{133, 6}_2
c    -b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_1
c    -b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨  b^{133, 6}_0
c  in DIMACS:
-20426 -20427  20428 -665  20429 0
-20426 -20427  20428 -665 -20430 0
-20426 -20427  20428 -665  20431 0

c  -1+1 --> 0
c    ( b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0 ∧  p_665) -> (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧ -b^{133, 6}_0)
c  in CNF:
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_2
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_1
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_0
c  in DIMACS:
-20426  20427 -20428 -665 -20429 0
-20426  20427 -20428 -665 -20430 0
-20426  20427 -20428 -665 -20431 0

c  0+1 --> 1
c    (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧  p_665) -> (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0)
c  in CNF:
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_2
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_1
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨  b^{133, 6}_0
c  in DIMACS:
 20426  20427  20428 -665 -20429 0
 20426  20427  20428 -665 -20430 0
 20426  20427  20428 -665  20431 0

c  1+1 --> 2
c    (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0 ∧  p_665) -> (-b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0)
c  in CNF:
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_2
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨  b^{133, 6}_1
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ -p_665 ∨ -b^{133, 6}_0
c  in DIMACS:
 20426  20427 -20428 -665 -20429 0
 20426  20427 -20428 -665  20430 0
 20426  20427 -20428 -665 -20431 0

c  2+1 --> break 
c    (-b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧  p_665) -> break
c  in CNF:
c     b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ -p_665 ∨ break
c  in DIMACS:
 20426 -20427  20428 -665 1162 0


c  2-1 --> 1
c    (-b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧ -p_665) -> (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0)
c  in CNF:
c     b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_2
c     b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_1
c     b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨  b^{133, 6}_0
c  in DIMACS:
 20426 -20427  20428  665 -20429 0
 20426 -20427  20428  665 -20430 0
 20426 -20427  20428  665  20431 0

c  1-1 --> 0
c    (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0 ∧ -p_665) -> (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧ -b^{133, 6}_0)
c  in CNF:
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_2
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_1
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_0
c  in DIMACS:
 20426  20427 -20428  665 -20429 0
 20426  20427 -20428  665 -20430 0
 20426  20427 -20428  665 -20431 0

c  0-1 --> -1
c    (-b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧ -p_665) -> ( b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0)
c  in CNF:
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨  b^{133, 6}_2
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_1
c     b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨  b^{133, 6}_0
c  in DIMACS:
 20426  20427  20428  665  20429 0
 20426  20427  20428  665 -20430 0
 20426  20427  20428  665  20431 0

c  -1-1 --> -2
c    ( b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧  b^{133, 5}_0 ∧ -p_665) -> ( b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0)
c  in CNF:
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨  b^{133, 6}_2
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨  b^{133, 6}_1
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨  p_665 ∨ -b^{133, 6}_0
c  in DIMACS:
-20426  20427 -20428  665  20429 0
-20426  20427 -20428  665  20430 0
-20426  20427 -20428  665 -20431 0

c  -2-1 --> break 
c    ( b^{133, 5}_2 ∧  b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧ -p_665) -> break
c  in CNF:
c    -b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨  b^{133, 5}_0 ∨  p_665 ∨ break
c  in DIMACS:
-20426 -20427  20428  665 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 5}_2 ∧ -b^{133, 5}_1 ∧ -b^{133, 5}_0 ∧ true) 
c  in CNF:
c    -b^{133, 5}_2 ∨  b^{133, 5}_1 ∨  b^{133, 5}_0 ∨ false 
c  in DIMACS:
-20426  20427  20428  0

c  3 does not represent an automaton state.
c    -(-b^{133, 5}_2 ∧  b^{133, 5}_1 ∧  b^{133, 5}_0 ∧ true) 
c  in CNF:
c     b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ false 
c  in DIMACS:
 20426 -20427 -20428  0
c  -3 does not represent an automaton state.
c    -( b^{133, 5}_2 ∧  b^{133, 5}_1 ∧  b^{133, 5}_0 ∧ true) 
c  in CNF:
c    -b^{133, 5}_2 ∨ -b^{133, 5}_1 ∨ -b^{133, 5}_0 ∨ false 
c  in DIMACS:
-20426 -20427 -20428  0

c i = 6
c  -2+1 --> -1
c    ( b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧  p_798) -> ( b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0)
c  in CNF:
c    -b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨  b^{133, 7}_2
c    -b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_1
c    -b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨  b^{133, 7}_0
c  in DIMACS:
-20429 -20430  20431 -798  20432 0
-20429 -20430  20431 -798 -20433 0
-20429 -20430  20431 -798  20434 0

c  -1+1 --> 0
c    ( b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0 ∧  p_798) -> (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧ -b^{133, 7}_0)
c  in CNF:
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_2
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_1
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_0
c  in DIMACS:
-20429  20430 -20431 -798 -20432 0
-20429  20430 -20431 -798 -20433 0
-20429  20430 -20431 -798 -20434 0

c  0+1 --> 1
c    (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧  p_798) -> (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0)
c  in CNF:
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_2
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_1
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨  b^{133, 7}_0
c  in DIMACS:
 20429  20430  20431 -798 -20432 0
 20429  20430  20431 -798 -20433 0
 20429  20430  20431 -798  20434 0

c  1+1 --> 2
c    (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0 ∧  p_798) -> (-b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0)
c  in CNF:
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_2
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨  b^{133, 7}_1
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ -p_798 ∨ -b^{133, 7}_0
c  in DIMACS:
 20429  20430 -20431 -798 -20432 0
 20429  20430 -20431 -798  20433 0
 20429  20430 -20431 -798 -20434 0

c  2+1 --> break 
c    (-b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧  p_798) -> break
c  in CNF:
c     b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 20429 -20430  20431 -798 1162 0


c  2-1 --> 1
c    (-b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧ -p_798) -> (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0)
c  in CNF:
c     b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_2
c     b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_1
c     b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨  b^{133, 7}_0
c  in DIMACS:
 20429 -20430  20431  798 -20432 0
 20429 -20430  20431  798 -20433 0
 20429 -20430  20431  798  20434 0

c  1-1 --> 0
c    (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0 ∧ -p_798) -> (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧ -b^{133, 7}_0)
c  in CNF:
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_2
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_1
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_0
c  in DIMACS:
 20429  20430 -20431  798 -20432 0
 20429  20430 -20431  798 -20433 0
 20429  20430 -20431  798 -20434 0

c  0-1 --> -1
c    (-b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧ -p_798) -> ( b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0)
c  in CNF:
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨  b^{133, 7}_2
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_1
c     b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨  b^{133, 7}_0
c  in DIMACS:
 20429  20430  20431  798  20432 0
 20429  20430  20431  798 -20433 0
 20429  20430  20431  798  20434 0

c  -1-1 --> -2
c    ( b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧  b^{133, 6}_0 ∧ -p_798) -> ( b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0)
c  in CNF:
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨  b^{133, 7}_2
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨  b^{133, 7}_1
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨  p_798 ∨ -b^{133, 7}_0
c  in DIMACS:
-20429  20430 -20431  798  20432 0
-20429  20430 -20431  798  20433 0
-20429  20430 -20431  798 -20434 0

c  -2-1 --> break 
c    ( b^{133, 6}_2 ∧  b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨  b^{133, 6}_0 ∨  p_798 ∨ break
c  in DIMACS:
-20429 -20430  20431  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 6}_2 ∧ -b^{133, 6}_1 ∧ -b^{133, 6}_0 ∧ true) 
c  in CNF:
c    -b^{133, 6}_2 ∨  b^{133, 6}_1 ∨  b^{133, 6}_0 ∨ false 
c  in DIMACS:
-20429  20430  20431  0

c  3 does not represent an automaton state.
c    -(-b^{133, 6}_2 ∧  b^{133, 6}_1 ∧  b^{133, 6}_0 ∧ true) 
c  in CNF:
c     b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ false 
c  in DIMACS:
 20429 -20430 -20431  0
c  -3 does not represent an automaton state.
c    -( b^{133, 6}_2 ∧  b^{133, 6}_1 ∧  b^{133, 6}_0 ∧ true) 
c  in CNF:
c    -b^{133, 6}_2 ∨ -b^{133, 6}_1 ∨ -b^{133, 6}_0 ∨ false 
c  in DIMACS:
-20429 -20430 -20431  0

c i = 7
c  -2+1 --> -1
c    ( b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧  p_931) -> ( b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0)
c  in CNF:
c    -b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨  b^{133, 8}_2
c    -b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_1
c    -b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨  b^{133, 8}_0
c  in DIMACS:
-20432 -20433  20434 -931  20435 0
-20432 -20433  20434 -931 -20436 0
-20432 -20433  20434 -931  20437 0

c  -1+1 --> 0
c    ( b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0 ∧  p_931) -> (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧ -b^{133, 8}_0)
c  in CNF:
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_2
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_1
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_0
c  in DIMACS:
-20432  20433 -20434 -931 -20435 0
-20432  20433 -20434 -931 -20436 0
-20432  20433 -20434 -931 -20437 0

c  0+1 --> 1
c    (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧  p_931) -> (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0)
c  in CNF:
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_2
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_1
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨  b^{133, 8}_0
c  in DIMACS:
 20432  20433  20434 -931 -20435 0
 20432  20433  20434 -931 -20436 0
 20432  20433  20434 -931  20437 0

c  1+1 --> 2
c    (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0 ∧  p_931) -> (-b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0)
c  in CNF:
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_2
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨  b^{133, 8}_1
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ -p_931 ∨ -b^{133, 8}_0
c  in DIMACS:
 20432  20433 -20434 -931 -20435 0
 20432  20433 -20434 -931  20436 0
 20432  20433 -20434 -931 -20437 0

c  2+1 --> break 
c    (-b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧  p_931) -> break
c  in CNF:
c     b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ -p_931 ∨ break
c  in DIMACS:
 20432 -20433  20434 -931 1162 0


c  2-1 --> 1
c    (-b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧ -p_931) -> (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0)
c  in CNF:
c     b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_2
c     b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_1
c     b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨  b^{133, 8}_0
c  in DIMACS:
 20432 -20433  20434  931 -20435 0
 20432 -20433  20434  931 -20436 0
 20432 -20433  20434  931  20437 0

c  1-1 --> 0
c    (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0 ∧ -p_931) -> (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧ -b^{133, 8}_0)
c  in CNF:
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_2
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_1
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_0
c  in DIMACS:
 20432  20433 -20434  931 -20435 0
 20432  20433 -20434  931 -20436 0
 20432  20433 -20434  931 -20437 0

c  0-1 --> -1
c    (-b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧ -p_931) -> ( b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0)
c  in CNF:
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨  b^{133, 8}_2
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_1
c     b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨  b^{133, 8}_0
c  in DIMACS:
 20432  20433  20434  931  20435 0
 20432  20433  20434  931 -20436 0
 20432  20433  20434  931  20437 0

c  -1-1 --> -2
c    ( b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧  b^{133, 7}_0 ∧ -p_931) -> ( b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0)
c  in CNF:
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨  b^{133, 8}_2
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨  b^{133, 8}_1
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨  p_931 ∨ -b^{133, 8}_0
c  in DIMACS:
-20432  20433 -20434  931  20435 0
-20432  20433 -20434  931  20436 0
-20432  20433 -20434  931 -20437 0

c  -2-1 --> break 
c    ( b^{133, 7}_2 ∧  b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧ -p_931) -> break
c  in CNF:
c    -b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨  b^{133, 7}_0 ∨  p_931 ∨ break
c  in DIMACS:
-20432 -20433  20434  931 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 7}_2 ∧ -b^{133, 7}_1 ∧ -b^{133, 7}_0 ∧ true) 
c  in CNF:
c    -b^{133, 7}_2 ∨  b^{133, 7}_1 ∨  b^{133, 7}_0 ∨ false 
c  in DIMACS:
-20432  20433  20434  0

c  3 does not represent an automaton state.
c    -(-b^{133, 7}_2 ∧  b^{133, 7}_1 ∧  b^{133, 7}_0 ∧ true) 
c  in CNF:
c     b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ false 
c  in DIMACS:
 20432 -20433 -20434  0
c  -3 does not represent an automaton state.
c    -( b^{133, 7}_2 ∧  b^{133, 7}_1 ∧  b^{133, 7}_0 ∧ true) 
c  in CNF:
c    -b^{133, 7}_2 ∨ -b^{133, 7}_1 ∨ -b^{133, 7}_0 ∨ false 
c  in DIMACS:
-20432 -20433 -20434  0

c i = 8
c  -2+1 --> -1
c    ( b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧  p_1064) -> ( b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧  b^{133, 9}_0)
c  in CNF:
c    -b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨  b^{133, 9}_2
c    -b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_1
c    -b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨  b^{133, 9}_0
c  in DIMACS:
-20435 -20436  20437 -1064  20438 0
-20435 -20436  20437 -1064 -20439 0
-20435 -20436  20437 -1064  20440 0

c  -1+1 --> 0
c    ( b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0 ∧  p_1064) -> (-b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧ -b^{133, 9}_0)
c  in CNF:
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_2
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_1
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_0
c  in DIMACS:
-20435  20436 -20437 -1064 -20438 0
-20435  20436 -20437 -1064 -20439 0
-20435  20436 -20437 -1064 -20440 0

c  0+1 --> 1
c    (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧  p_1064) -> (-b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧  b^{133, 9}_0)
c  in CNF:
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_2
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_1
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨  b^{133, 9}_0
c  in DIMACS:
 20435  20436  20437 -1064 -20438 0
 20435  20436  20437 -1064 -20439 0
 20435  20436  20437 -1064  20440 0

c  1+1 --> 2
c    (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0 ∧  p_1064) -> (-b^{133, 9}_2 ∧  b^{133, 9}_1 ∧ -b^{133, 9}_0)
c  in CNF:
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_2
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨  b^{133, 9}_1
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ -p_1064 ∨ -b^{133, 9}_0
c  in DIMACS:
 20435  20436 -20437 -1064 -20438 0
 20435  20436 -20437 -1064  20439 0
 20435  20436 -20437 -1064 -20440 0

c  2+1 --> break 
c    (-b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 20435 -20436  20437 -1064 1162 0


c  2-1 --> 1
c    (-b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧ -p_1064) -> (-b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧  b^{133, 9}_0)
c  in CNF:
c     b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_2
c     b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_1
c     b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨  b^{133, 9}_0
c  in DIMACS:
 20435 -20436  20437  1064 -20438 0
 20435 -20436  20437  1064 -20439 0
 20435 -20436  20437  1064  20440 0

c  1-1 --> 0
c    (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0 ∧ -p_1064) -> (-b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧ -b^{133, 9}_0)
c  in CNF:
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_2
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_1
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_0
c  in DIMACS:
 20435  20436 -20437  1064 -20438 0
 20435  20436 -20437  1064 -20439 0
 20435  20436 -20437  1064 -20440 0

c  0-1 --> -1
c    (-b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧ -p_1064) -> ( b^{133, 9}_2 ∧ -b^{133, 9}_1 ∧  b^{133, 9}_0)
c  in CNF:
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨  b^{133, 9}_2
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_1
c     b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨  b^{133, 9}_0
c  in DIMACS:
 20435  20436  20437  1064  20438 0
 20435  20436  20437  1064 -20439 0
 20435  20436  20437  1064  20440 0

c  -1-1 --> -2
c    ( b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧  b^{133, 8}_0 ∧ -p_1064) -> ( b^{133, 9}_2 ∧  b^{133, 9}_1 ∧ -b^{133, 9}_0)
c  in CNF:
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨  b^{133, 9}_2
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨  b^{133, 9}_1
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨  p_1064 ∨ -b^{133, 9}_0
c  in DIMACS:
-20435  20436 -20437  1064  20438 0
-20435  20436 -20437  1064  20439 0
-20435  20436 -20437  1064 -20440 0

c  -2-1 --> break 
c    ( b^{133, 8}_2 ∧  b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨  b^{133, 8}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-20435 -20436  20437  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{133, 8}_2 ∧ -b^{133, 8}_1 ∧ -b^{133, 8}_0 ∧ true) 
c  in CNF:
c    -b^{133, 8}_2 ∨  b^{133, 8}_1 ∨  b^{133, 8}_0 ∨ false 
c  in DIMACS:
-20435  20436  20437  0

c  3 does not represent an automaton state.
c    -(-b^{133, 8}_2 ∧  b^{133, 8}_1 ∧  b^{133, 8}_0 ∧ true) 
c  in CNF:
c     b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ false 
c  in DIMACS:
 20435 -20436 -20437  0
c  -3 does not represent an automaton state.
c    -( b^{133, 8}_2 ∧  b^{133, 8}_1 ∧  b^{133, 8}_0 ∧ true) 
c  in CNF:
c    -b^{133, 8}_2 ∨ -b^{133, 8}_1 ∨ -b^{133, 8}_0 ∨ false 
c  in DIMACS:
-20435 -20436 -20437  0

c INIT for k = 134
c    -b^{134, 1}_2
c    -b^{134, 1}_1
c    -b^{134, 1}_0
c  in DIMACS:
-20441 0
-20442 0
-20443 0

c Transitions for k = 134
c i = 1
c  -2+1 --> -1
c    ( b^{134, 1}_2 ∧  b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧  p_134) -> ( b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0)
c  in CNF:
c    -b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨  b^{134, 2}_2
c    -b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_1
c    -b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨  b^{134, 2}_0
c  in DIMACS:
-20441 -20442  20443 -134  20444 0
-20441 -20442  20443 -134 -20445 0
-20441 -20442  20443 -134  20446 0

c  -1+1 --> 0
c    ( b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧  b^{134, 1}_0 ∧  p_134) -> (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧ -b^{134, 2}_0)
c  in CNF:
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_2
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_1
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_0
c  in DIMACS:
-20441  20442 -20443 -134 -20444 0
-20441  20442 -20443 -134 -20445 0
-20441  20442 -20443 -134 -20446 0

c  0+1 --> 1
c    (-b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧  p_134) -> (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0)
c  in CNF:
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_2
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_1
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨  b^{134, 2}_0
c  in DIMACS:
 20441  20442  20443 -134 -20444 0
 20441  20442  20443 -134 -20445 0
 20441  20442  20443 -134  20446 0

c  1+1 --> 2
c    (-b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧  b^{134, 1}_0 ∧  p_134) -> (-b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0)
c  in CNF:
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_2
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨  b^{134, 2}_1
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ -p_134 ∨ -b^{134, 2}_0
c  in DIMACS:
 20441  20442 -20443 -134 -20444 0
 20441  20442 -20443 -134  20445 0
 20441  20442 -20443 -134 -20446 0

c  2+1 --> break 
c    (-b^{134, 1}_2 ∧  b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧  p_134) -> break
c  in CNF:
c     b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ -p_134 ∨ break
c  in DIMACS:
 20441 -20442  20443 -134 1162 0


c  2-1 --> 1
c    (-b^{134, 1}_2 ∧  b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧ -p_134) -> (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0)
c  in CNF:
c     b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_2
c     b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_1
c     b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨  b^{134, 2}_0
c  in DIMACS:
 20441 -20442  20443  134 -20444 0
 20441 -20442  20443  134 -20445 0
 20441 -20442  20443  134  20446 0

c  1-1 --> 0
c    (-b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧  b^{134, 1}_0 ∧ -p_134) -> (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧ -b^{134, 2}_0)
c  in CNF:
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_2
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_1
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_0
c  in DIMACS:
 20441  20442 -20443  134 -20444 0
 20441  20442 -20443  134 -20445 0
 20441  20442 -20443  134 -20446 0

c  0-1 --> -1
c    (-b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧ -p_134) -> ( b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0)
c  in CNF:
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨  b^{134, 2}_2
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_1
c     b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨  b^{134, 2}_0
c  in DIMACS:
 20441  20442  20443  134  20444 0
 20441  20442  20443  134 -20445 0
 20441  20442  20443  134  20446 0

c  -1-1 --> -2
c    ( b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧  b^{134, 1}_0 ∧ -p_134) -> ( b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0)
c  in CNF:
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨  b^{134, 2}_2
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨  b^{134, 2}_1
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨  p_134 ∨ -b^{134, 2}_0
c  in DIMACS:
-20441  20442 -20443  134  20444 0
-20441  20442 -20443  134  20445 0
-20441  20442 -20443  134 -20446 0

c  -2-1 --> break 
c    ( b^{134, 1}_2 ∧  b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧ -p_134) -> break
c  in CNF:
c    -b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨  b^{134, 1}_0 ∨  p_134 ∨ break
c  in DIMACS:
-20441 -20442  20443  134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 1}_2 ∧ -b^{134, 1}_1 ∧ -b^{134, 1}_0 ∧ true) 
c  in CNF:
c    -b^{134, 1}_2 ∨  b^{134, 1}_1 ∨  b^{134, 1}_0 ∨ false 
c  in DIMACS:
-20441  20442  20443  0

c  3 does not represent an automaton state.
c    -(-b^{134, 1}_2 ∧  b^{134, 1}_1 ∧  b^{134, 1}_0 ∧ true) 
c  in CNF:
c     b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ false 
c  in DIMACS:
 20441 -20442 -20443  0
c  -3 does not represent an automaton state.
c    -( b^{134, 1}_2 ∧  b^{134, 1}_1 ∧  b^{134, 1}_0 ∧ true) 
c  in CNF:
c    -b^{134, 1}_2 ∨ -b^{134, 1}_1 ∨ -b^{134, 1}_0 ∨ false 
c  in DIMACS:
-20441 -20442 -20443  0

c i = 2
c  -2+1 --> -1
c    ( b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧  p_268) -> ( b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0)
c  in CNF:
c    -b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨  b^{134, 3}_2
c    -b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_1
c    -b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨  b^{134, 3}_0
c  in DIMACS:
-20444 -20445  20446 -268  20447 0
-20444 -20445  20446 -268 -20448 0
-20444 -20445  20446 -268  20449 0

c  -1+1 --> 0
c    ( b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0 ∧  p_268) -> (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧ -b^{134, 3}_0)
c  in CNF:
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_2
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_1
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_0
c  in DIMACS:
-20444  20445 -20446 -268 -20447 0
-20444  20445 -20446 -268 -20448 0
-20444  20445 -20446 -268 -20449 0

c  0+1 --> 1
c    (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧  p_268) -> (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0)
c  in CNF:
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_2
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_1
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨  b^{134, 3}_0
c  in DIMACS:
 20444  20445  20446 -268 -20447 0
 20444  20445  20446 -268 -20448 0
 20444  20445  20446 -268  20449 0

c  1+1 --> 2
c    (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0 ∧  p_268) -> (-b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0)
c  in CNF:
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_2
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨  b^{134, 3}_1
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ -p_268 ∨ -b^{134, 3}_0
c  in DIMACS:
 20444  20445 -20446 -268 -20447 0
 20444  20445 -20446 -268  20448 0
 20444  20445 -20446 -268 -20449 0

c  2+1 --> break 
c    (-b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧  p_268) -> break
c  in CNF:
c     b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 20444 -20445  20446 -268 1162 0


c  2-1 --> 1
c    (-b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧ -p_268) -> (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0)
c  in CNF:
c     b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_2
c     b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_1
c     b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨  b^{134, 3}_0
c  in DIMACS:
 20444 -20445  20446  268 -20447 0
 20444 -20445  20446  268 -20448 0
 20444 -20445  20446  268  20449 0

c  1-1 --> 0
c    (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0 ∧ -p_268) -> (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧ -b^{134, 3}_0)
c  in CNF:
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_2
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_1
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_0
c  in DIMACS:
 20444  20445 -20446  268 -20447 0
 20444  20445 -20446  268 -20448 0
 20444  20445 -20446  268 -20449 0

c  0-1 --> -1
c    (-b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧ -p_268) -> ( b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0)
c  in CNF:
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨  b^{134, 3}_2
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_1
c     b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨  b^{134, 3}_0
c  in DIMACS:
 20444  20445  20446  268  20447 0
 20444  20445  20446  268 -20448 0
 20444  20445  20446  268  20449 0

c  -1-1 --> -2
c    ( b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧  b^{134, 2}_0 ∧ -p_268) -> ( b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0)
c  in CNF:
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨  b^{134, 3}_2
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨  b^{134, 3}_1
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨  p_268 ∨ -b^{134, 3}_0
c  in DIMACS:
-20444  20445 -20446  268  20447 0
-20444  20445 -20446  268  20448 0
-20444  20445 -20446  268 -20449 0

c  -2-1 --> break 
c    ( b^{134, 2}_2 ∧  b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨  b^{134, 2}_0 ∨  p_268 ∨ break
c  in DIMACS:
-20444 -20445  20446  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 2}_2 ∧ -b^{134, 2}_1 ∧ -b^{134, 2}_0 ∧ true) 
c  in CNF:
c    -b^{134, 2}_2 ∨  b^{134, 2}_1 ∨  b^{134, 2}_0 ∨ false 
c  in DIMACS:
-20444  20445  20446  0

c  3 does not represent an automaton state.
c    -(-b^{134, 2}_2 ∧  b^{134, 2}_1 ∧  b^{134, 2}_0 ∧ true) 
c  in CNF:
c     b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ false 
c  in DIMACS:
 20444 -20445 -20446  0
c  -3 does not represent an automaton state.
c    -( b^{134, 2}_2 ∧  b^{134, 2}_1 ∧  b^{134, 2}_0 ∧ true) 
c  in CNF:
c    -b^{134, 2}_2 ∨ -b^{134, 2}_1 ∨ -b^{134, 2}_0 ∨ false 
c  in DIMACS:
-20444 -20445 -20446  0

c i = 3
c  -2+1 --> -1
c    ( b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧  p_402) -> ( b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0)
c  in CNF:
c    -b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨  b^{134, 4}_2
c    -b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_1
c    -b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨  b^{134, 4}_0
c  in DIMACS:
-20447 -20448  20449 -402  20450 0
-20447 -20448  20449 -402 -20451 0
-20447 -20448  20449 -402  20452 0

c  -1+1 --> 0
c    ( b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0 ∧  p_402) -> (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧ -b^{134, 4}_0)
c  in CNF:
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_2
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_1
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_0
c  in DIMACS:
-20447  20448 -20449 -402 -20450 0
-20447  20448 -20449 -402 -20451 0
-20447  20448 -20449 -402 -20452 0

c  0+1 --> 1
c    (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧  p_402) -> (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0)
c  in CNF:
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_2
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_1
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨  b^{134, 4}_0
c  in DIMACS:
 20447  20448  20449 -402 -20450 0
 20447  20448  20449 -402 -20451 0
 20447  20448  20449 -402  20452 0

c  1+1 --> 2
c    (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0 ∧  p_402) -> (-b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0)
c  in CNF:
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_2
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨  b^{134, 4}_1
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ -p_402 ∨ -b^{134, 4}_0
c  in DIMACS:
 20447  20448 -20449 -402 -20450 0
 20447  20448 -20449 -402  20451 0
 20447  20448 -20449 -402 -20452 0

c  2+1 --> break 
c    (-b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧  p_402) -> break
c  in CNF:
c     b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 20447 -20448  20449 -402 1162 0


c  2-1 --> 1
c    (-b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧ -p_402) -> (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0)
c  in CNF:
c     b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_2
c     b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_1
c     b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨  b^{134, 4}_0
c  in DIMACS:
 20447 -20448  20449  402 -20450 0
 20447 -20448  20449  402 -20451 0
 20447 -20448  20449  402  20452 0

c  1-1 --> 0
c    (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0 ∧ -p_402) -> (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧ -b^{134, 4}_0)
c  in CNF:
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_2
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_1
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_0
c  in DIMACS:
 20447  20448 -20449  402 -20450 0
 20447  20448 -20449  402 -20451 0
 20447  20448 -20449  402 -20452 0

c  0-1 --> -1
c    (-b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧ -p_402) -> ( b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0)
c  in CNF:
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨  b^{134, 4}_2
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_1
c     b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨  b^{134, 4}_0
c  in DIMACS:
 20447  20448  20449  402  20450 0
 20447  20448  20449  402 -20451 0
 20447  20448  20449  402  20452 0

c  -1-1 --> -2
c    ( b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧  b^{134, 3}_0 ∧ -p_402) -> ( b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0)
c  in CNF:
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨  b^{134, 4}_2
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨  b^{134, 4}_1
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨  p_402 ∨ -b^{134, 4}_0
c  in DIMACS:
-20447  20448 -20449  402  20450 0
-20447  20448 -20449  402  20451 0
-20447  20448 -20449  402 -20452 0

c  -2-1 --> break 
c    ( b^{134, 3}_2 ∧  b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨  b^{134, 3}_0 ∨  p_402 ∨ break
c  in DIMACS:
-20447 -20448  20449  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 3}_2 ∧ -b^{134, 3}_1 ∧ -b^{134, 3}_0 ∧ true) 
c  in CNF:
c    -b^{134, 3}_2 ∨  b^{134, 3}_1 ∨  b^{134, 3}_0 ∨ false 
c  in DIMACS:
-20447  20448  20449  0

c  3 does not represent an automaton state.
c    -(-b^{134, 3}_2 ∧  b^{134, 3}_1 ∧  b^{134, 3}_0 ∧ true) 
c  in CNF:
c     b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ false 
c  in DIMACS:
 20447 -20448 -20449  0
c  -3 does not represent an automaton state.
c    -( b^{134, 3}_2 ∧  b^{134, 3}_1 ∧  b^{134, 3}_0 ∧ true) 
c  in CNF:
c    -b^{134, 3}_2 ∨ -b^{134, 3}_1 ∨ -b^{134, 3}_0 ∨ false 
c  in DIMACS:
-20447 -20448 -20449  0

c i = 4
c  -2+1 --> -1
c    ( b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧  p_536) -> ( b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0)
c  in CNF:
c    -b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨  b^{134, 5}_2
c    -b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_1
c    -b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨  b^{134, 5}_0
c  in DIMACS:
-20450 -20451  20452 -536  20453 0
-20450 -20451  20452 -536 -20454 0
-20450 -20451  20452 -536  20455 0

c  -1+1 --> 0
c    ( b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0 ∧  p_536) -> (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧ -b^{134, 5}_0)
c  in CNF:
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_2
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_1
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_0
c  in DIMACS:
-20450  20451 -20452 -536 -20453 0
-20450  20451 -20452 -536 -20454 0
-20450  20451 -20452 -536 -20455 0

c  0+1 --> 1
c    (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧  p_536) -> (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0)
c  in CNF:
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_2
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_1
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨  b^{134, 5}_0
c  in DIMACS:
 20450  20451  20452 -536 -20453 0
 20450  20451  20452 -536 -20454 0
 20450  20451  20452 -536  20455 0

c  1+1 --> 2
c    (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0 ∧  p_536) -> (-b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0)
c  in CNF:
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_2
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨  b^{134, 5}_1
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ -p_536 ∨ -b^{134, 5}_0
c  in DIMACS:
 20450  20451 -20452 -536 -20453 0
 20450  20451 -20452 -536  20454 0
 20450  20451 -20452 -536 -20455 0

c  2+1 --> break 
c    (-b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧  p_536) -> break
c  in CNF:
c     b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 20450 -20451  20452 -536 1162 0


c  2-1 --> 1
c    (-b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧ -p_536) -> (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0)
c  in CNF:
c     b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_2
c     b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_1
c     b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨  b^{134, 5}_0
c  in DIMACS:
 20450 -20451  20452  536 -20453 0
 20450 -20451  20452  536 -20454 0
 20450 -20451  20452  536  20455 0

c  1-1 --> 0
c    (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0 ∧ -p_536) -> (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧ -b^{134, 5}_0)
c  in CNF:
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_2
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_1
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_0
c  in DIMACS:
 20450  20451 -20452  536 -20453 0
 20450  20451 -20452  536 -20454 0
 20450  20451 -20452  536 -20455 0

c  0-1 --> -1
c    (-b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧ -p_536) -> ( b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0)
c  in CNF:
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨  b^{134, 5}_2
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_1
c     b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨  b^{134, 5}_0
c  in DIMACS:
 20450  20451  20452  536  20453 0
 20450  20451  20452  536 -20454 0
 20450  20451  20452  536  20455 0

c  -1-1 --> -2
c    ( b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧  b^{134, 4}_0 ∧ -p_536) -> ( b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0)
c  in CNF:
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨  b^{134, 5}_2
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨  b^{134, 5}_1
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨  p_536 ∨ -b^{134, 5}_0
c  in DIMACS:
-20450  20451 -20452  536  20453 0
-20450  20451 -20452  536  20454 0
-20450  20451 -20452  536 -20455 0

c  -2-1 --> break 
c    ( b^{134, 4}_2 ∧  b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨  b^{134, 4}_0 ∨  p_536 ∨ break
c  in DIMACS:
-20450 -20451  20452  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 4}_2 ∧ -b^{134, 4}_1 ∧ -b^{134, 4}_0 ∧ true) 
c  in CNF:
c    -b^{134, 4}_2 ∨  b^{134, 4}_1 ∨  b^{134, 4}_0 ∨ false 
c  in DIMACS:
-20450  20451  20452  0

c  3 does not represent an automaton state.
c    -(-b^{134, 4}_2 ∧  b^{134, 4}_1 ∧  b^{134, 4}_0 ∧ true) 
c  in CNF:
c     b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ false 
c  in DIMACS:
 20450 -20451 -20452  0
c  -3 does not represent an automaton state.
c    -( b^{134, 4}_2 ∧  b^{134, 4}_1 ∧  b^{134, 4}_0 ∧ true) 
c  in CNF:
c    -b^{134, 4}_2 ∨ -b^{134, 4}_1 ∨ -b^{134, 4}_0 ∨ false 
c  in DIMACS:
-20450 -20451 -20452  0

c i = 5
c  -2+1 --> -1
c    ( b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧  p_670) -> ( b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0)
c  in CNF:
c    -b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨  b^{134, 6}_2
c    -b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_1
c    -b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨  b^{134, 6}_0
c  in DIMACS:
-20453 -20454  20455 -670  20456 0
-20453 -20454  20455 -670 -20457 0
-20453 -20454  20455 -670  20458 0

c  -1+1 --> 0
c    ( b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0 ∧  p_670) -> (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧ -b^{134, 6}_0)
c  in CNF:
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_2
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_1
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_0
c  in DIMACS:
-20453  20454 -20455 -670 -20456 0
-20453  20454 -20455 -670 -20457 0
-20453  20454 -20455 -670 -20458 0

c  0+1 --> 1
c    (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧  p_670) -> (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0)
c  in CNF:
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_2
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_1
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨  b^{134, 6}_0
c  in DIMACS:
 20453  20454  20455 -670 -20456 0
 20453  20454  20455 -670 -20457 0
 20453  20454  20455 -670  20458 0

c  1+1 --> 2
c    (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0 ∧  p_670) -> (-b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0)
c  in CNF:
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_2
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨  b^{134, 6}_1
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ -p_670 ∨ -b^{134, 6}_0
c  in DIMACS:
 20453  20454 -20455 -670 -20456 0
 20453  20454 -20455 -670  20457 0
 20453  20454 -20455 -670 -20458 0

c  2+1 --> break 
c    (-b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧  p_670) -> break
c  in CNF:
c     b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 20453 -20454  20455 -670 1162 0


c  2-1 --> 1
c    (-b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧ -p_670) -> (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0)
c  in CNF:
c     b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_2
c     b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_1
c     b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨  b^{134, 6}_0
c  in DIMACS:
 20453 -20454  20455  670 -20456 0
 20453 -20454  20455  670 -20457 0
 20453 -20454  20455  670  20458 0

c  1-1 --> 0
c    (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0 ∧ -p_670) -> (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧ -b^{134, 6}_0)
c  in CNF:
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_2
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_1
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_0
c  in DIMACS:
 20453  20454 -20455  670 -20456 0
 20453  20454 -20455  670 -20457 0
 20453  20454 -20455  670 -20458 0

c  0-1 --> -1
c    (-b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧ -p_670) -> ( b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0)
c  in CNF:
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨  b^{134, 6}_2
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_1
c     b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨  b^{134, 6}_0
c  in DIMACS:
 20453  20454  20455  670  20456 0
 20453  20454  20455  670 -20457 0
 20453  20454  20455  670  20458 0

c  -1-1 --> -2
c    ( b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧  b^{134, 5}_0 ∧ -p_670) -> ( b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0)
c  in CNF:
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨  b^{134, 6}_2
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨  b^{134, 6}_1
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨  p_670 ∨ -b^{134, 6}_0
c  in DIMACS:
-20453  20454 -20455  670  20456 0
-20453  20454 -20455  670  20457 0
-20453  20454 -20455  670 -20458 0

c  -2-1 --> break 
c    ( b^{134, 5}_2 ∧  b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨  b^{134, 5}_0 ∨  p_670 ∨ break
c  in DIMACS:
-20453 -20454  20455  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 5}_2 ∧ -b^{134, 5}_1 ∧ -b^{134, 5}_0 ∧ true) 
c  in CNF:
c    -b^{134, 5}_2 ∨  b^{134, 5}_1 ∨  b^{134, 5}_0 ∨ false 
c  in DIMACS:
-20453  20454  20455  0

c  3 does not represent an automaton state.
c    -(-b^{134, 5}_2 ∧  b^{134, 5}_1 ∧  b^{134, 5}_0 ∧ true) 
c  in CNF:
c     b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ false 
c  in DIMACS:
 20453 -20454 -20455  0
c  -3 does not represent an automaton state.
c    -( b^{134, 5}_2 ∧  b^{134, 5}_1 ∧  b^{134, 5}_0 ∧ true) 
c  in CNF:
c    -b^{134, 5}_2 ∨ -b^{134, 5}_1 ∨ -b^{134, 5}_0 ∨ false 
c  in DIMACS:
-20453 -20454 -20455  0

c i = 6
c  -2+1 --> -1
c    ( b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧  p_804) -> ( b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0)
c  in CNF:
c    -b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨  b^{134, 7}_2
c    -b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_1
c    -b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨  b^{134, 7}_0
c  in DIMACS:
-20456 -20457  20458 -804  20459 0
-20456 -20457  20458 -804 -20460 0
-20456 -20457  20458 -804  20461 0

c  -1+1 --> 0
c    ( b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0 ∧  p_804) -> (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧ -b^{134, 7}_0)
c  in CNF:
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_2
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_1
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_0
c  in DIMACS:
-20456  20457 -20458 -804 -20459 0
-20456  20457 -20458 -804 -20460 0
-20456  20457 -20458 -804 -20461 0

c  0+1 --> 1
c    (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧  p_804) -> (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0)
c  in CNF:
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_2
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_1
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨  b^{134, 7}_0
c  in DIMACS:
 20456  20457  20458 -804 -20459 0
 20456  20457  20458 -804 -20460 0
 20456  20457  20458 -804  20461 0

c  1+1 --> 2
c    (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0 ∧  p_804) -> (-b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0)
c  in CNF:
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_2
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨  b^{134, 7}_1
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ -p_804 ∨ -b^{134, 7}_0
c  in DIMACS:
 20456  20457 -20458 -804 -20459 0
 20456  20457 -20458 -804  20460 0
 20456  20457 -20458 -804 -20461 0

c  2+1 --> break 
c    (-b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧  p_804) -> break
c  in CNF:
c     b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 20456 -20457  20458 -804 1162 0


c  2-1 --> 1
c    (-b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧ -p_804) -> (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0)
c  in CNF:
c     b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_2
c     b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_1
c     b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨  b^{134, 7}_0
c  in DIMACS:
 20456 -20457  20458  804 -20459 0
 20456 -20457  20458  804 -20460 0
 20456 -20457  20458  804  20461 0

c  1-1 --> 0
c    (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0 ∧ -p_804) -> (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧ -b^{134, 7}_0)
c  in CNF:
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_2
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_1
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_0
c  in DIMACS:
 20456  20457 -20458  804 -20459 0
 20456  20457 -20458  804 -20460 0
 20456  20457 -20458  804 -20461 0

c  0-1 --> -1
c    (-b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧ -p_804) -> ( b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0)
c  in CNF:
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨  b^{134, 7}_2
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_1
c     b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨  b^{134, 7}_0
c  in DIMACS:
 20456  20457  20458  804  20459 0
 20456  20457  20458  804 -20460 0
 20456  20457  20458  804  20461 0

c  -1-1 --> -2
c    ( b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧  b^{134, 6}_0 ∧ -p_804) -> ( b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0)
c  in CNF:
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨  b^{134, 7}_2
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨  b^{134, 7}_1
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨  p_804 ∨ -b^{134, 7}_0
c  in DIMACS:
-20456  20457 -20458  804  20459 0
-20456  20457 -20458  804  20460 0
-20456  20457 -20458  804 -20461 0

c  -2-1 --> break 
c    ( b^{134, 6}_2 ∧  b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨  b^{134, 6}_0 ∨  p_804 ∨ break
c  in DIMACS:
-20456 -20457  20458  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 6}_2 ∧ -b^{134, 6}_1 ∧ -b^{134, 6}_0 ∧ true) 
c  in CNF:
c    -b^{134, 6}_2 ∨  b^{134, 6}_1 ∨  b^{134, 6}_0 ∨ false 
c  in DIMACS:
-20456  20457  20458  0

c  3 does not represent an automaton state.
c    -(-b^{134, 6}_2 ∧  b^{134, 6}_1 ∧  b^{134, 6}_0 ∧ true) 
c  in CNF:
c     b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ false 
c  in DIMACS:
 20456 -20457 -20458  0
c  -3 does not represent an automaton state.
c    -( b^{134, 6}_2 ∧  b^{134, 6}_1 ∧  b^{134, 6}_0 ∧ true) 
c  in CNF:
c    -b^{134, 6}_2 ∨ -b^{134, 6}_1 ∨ -b^{134, 6}_0 ∨ false 
c  in DIMACS:
-20456 -20457 -20458  0

c i = 7
c  -2+1 --> -1
c    ( b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧  p_938) -> ( b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0)
c  in CNF:
c    -b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨  b^{134, 8}_2
c    -b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_1
c    -b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨  b^{134, 8}_0
c  in DIMACS:
-20459 -20460  20461 -938  20462 0
-20459 -20460  20461 -938 -20463 0
-20459 -20460  20461 -938  20464 0

c  -1+1 --> 0
c    ( b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0 ∧  p_938) -> (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧ -b^{134, 8}_0)
c  in CNF:
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_2
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_1
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_0
c  in DIMACS:
-20459  20460 -20461 -938 -20462 0
-20459  20460 -20461 -938 -20463 0
-20459  20460 -20461 -938 -20464 0

c  0+1 --> 1
c    (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧  p_938) -> (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0)
c  in CNF:
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_2
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_1
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨  b^{134, 8}_0
c  in DIMACS:
 20459  20460  20461 -938 -20462 0
 20459  20460  20461 -938 -20463 0
 20459  20460  20461 -938  20464 0

c  1+1 --> 2
c    (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0 ∧  p_938) -> (-b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0)
c  in CNF:
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_2
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨  b^{134, 8}_1
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ -p_938 ∨ -b^{134, 8}_0
c  in DIMACS:
 20459  20460 -20461 -938 -20462 0
 20459  20460 -20461 -938  20463 0
 20459  20460 -20461 -938 -20464 0

c  2+1 --> break 
c    (-b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧  p_938) -> break
c  in CNF:
c     b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ -p_938 ∨ break
c  in DIMACS:
 20459 -20460  20461 -938 1162 0


c  2-1 --> 1
c    (-b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧ -p_938) -> (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0)
c  in CNF:
c     b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_2
c     b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_1
c     b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨  b^{134, 8}_0
c  in DIMACS:
 20459 -20460  20461  938 -20462 0
 20459 -20460  20461  938 -20463 0
 20459 -20460  20461  938  20464 0

c  1-1 --> 0
c    (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0 ∧ -p_938) -> (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧ -b^{134, 8}_0)
c  in CNF:
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_2
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_1
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_0
c  in DIMACS:
 20459  20460 -20461  938 -20462 0
 20459  20460 -20461  938 -20463 0
 20459  20460 -20461  938 -20464 0

c  0-1 --> -1
c    (-b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧ -p_938) -> ( b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0)
c  in CNF:
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨  b^{134, 8}_2
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_1
c     b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨  b^{134, 8}_0
c  in DIMACS:
 20459  20460  20461  938  20462 0
 20459  20460  20461  938 -20463 0
 20459  20460  20461  938  20464 0

c  -1-1 --> -2
c    ( b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧  b^{134, 7}_0 ∧ -p_938) -> ( b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0)
c  in CNF:
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨  b^{134, 8}_2
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨  b^{134, 8}_1
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨  p_938 ∨ -b^{134, 8}_0
c  in DIMACS:
-20459  20460 -20461  938  20462 0
-20459  20460 -20461  938  20463 0
-20459  20460 -20461  938 -20464 0

c  -2-1 --> break 
c    ( b^{134, 7}_2 ∧  b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧ -p_938) -> break
c  in CNF:
c    -b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨  b^{134, 7}_0 ∨  p_938 ∨ break
c  in DIMACS:
-20459 -20460  20461  938 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 7}_2 ∧ -b^{134, 7}_1 ∧ -b^{134, 7}_0 ∧ true) 
c  in CNF:
c    -b^{134, 7}_2 ∨  b^{134, 7}_1 ∨  b^{134, 7}_0 ∨ false 
c  in DIMACS:
-20459  20460  20461  0

c  3 does not represent an automaton state.
c    -(-b^{134, 7}_2 ∧  b^{134, 7}_1 ∧  b^{134, 7}_0 ∧ true) 
c  in CNF:
c     b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ false 
c  in DIMACS:
 20459 -20460 -20461  0
c  -3 does not represent an automaton state.
c    -( b^{134, 7}_2 ∧  b^{134, 7}_1 ∧  b^{134, 7}_0 ∧ true) 
c  in CNF:
c    -b^{134, 7}_2 ∨ -b^{134, 7}_1 ∨ -b^{134, 7}_0 ∨ false 
c  in DIMACS:
-20459 -20460 -20461  0

c i = 8
c  -2+1 --> -1
c    ( b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧  p_1072) -> ( b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧  b^{134, 9}_0)
c  in CNF:
c    -b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨  b^{134, 9}_2
c    -b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_1
c    -b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨  b^{134, 9}_0
c  in DIMACS:
-20462 -20463  20464 -1072  20465 0
-20462 -20463  20464 -1072 -20466 0
-20462 -20463  20464 -1072  20467 0

c  -1+1 --> 0
c    ( b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0 ∧  p_1072) -> (-b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧ -b^{134, 9}_0)
c  in CNF:
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_2
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_1
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_0
c  in DIMACS:
-20462  20463 -20464 -1072 -20465 0
-20462  20463 -20464 -1072 -20466 0
-20462  20463 -20464 -1072 -20467 0

c  0+1 --> 1
c    (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧  p_1072) -> (-b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧  b^{134, 9}_0)
c  in CNF:
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_2
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_1
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨  b^{134, 9}_0
c  in DIMACS:
 20462  20463  20464 -1072 -20465 0
 20462  20463  20464 -1072 -20466 0
 20462  20463  20464 -1072  20467 0

c  1+1 --> 2
c    (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0 ∧  p_1072) -> (-b^{134, 9}_2 ∧  b^{134, 9}_1 ∧ -b^{134, 9}_0)
c  in CNF:
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_2
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨  b^{134, 9}_1
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ -p_1072 ∨ -b^{134, 9}_0
c  in DIMACS:
 20462  20463 -20464 -1072 -20465 0
 20462  20463 -20464 -1072  20466 0
 20462  20463 -20464 -1072 -20467 0

c  2+1 --> break 
c    (-b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 20462 -20463  20464 -1072 1162 0


c  2-1 --> 1
c    (-b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧ -p_1072) -> (-b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧  b^{134, 9}_0)
c  in CNF:
c     b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_2
c     b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_1
c     b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨  b^{134, 9}_0
c  in DIMACS:
 20462 -20463  20464  1072 -20465 0
 20462 -20463  20464  1072 -20466 0
 20462 -20463  20464  1072  20467 0

c  1-1 --> 0
c    (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0 ∧ -p_1072) -> (-b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧ -b^{134, 9}_0)
c  in CNF:
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_2
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_1
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_0
c  in DIMACS:
 20462  20463 -20464  1072 -20465 0
 20462  20463 -20464  1072 -20466 0
 20462  20463 -20464  1072 -20467 0

c  0-1 --> -1
c    (-b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧ -p_1072) -> ( b^{134, 9}_2 ∧ -b^{134, 9}_1 ∧  b^{134, 9}_0)
c  in CNF:
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨  b^{134, 9}_2
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_1
c     b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨  b^{134, 9}_0
c  in DIMACS:
 20462  20463  20464  1072  20465 0
 20462  20463  20464  1072 -20466 0
 20462  20463  20464  1072  20467 0

c  -1-1 --> -2
c    ( b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧  b^{134, 8}_0 ∧ -p_1072) -> ( b^{134, 9}_2 ∧  b^{134, 9}_1 ∧ -b^{134, 9}_0)
c  in CNF:
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨  b^{134, 9}_2
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨  b^{134, 9}_1
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨  p_1072 ∨ -b^{134, 9}_0
c  in DIMACS:
-20462  20463 -20464  1072  20465 0
-20462  20463 -20464  1072  20466 0
-20462  20463 -20464  1072 -20467 0

c  -2-1 --> break 
c    ( b^{134, 8}_2 ∧  b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨  b^{134, 8}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-20462 -20463  20464  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{134, 8}_2 ∧ -b^{134, 8}_1 ∧ -b^{134, 8}_0 ∧ true) 
c  in CNF:
c    -b^{134, 8}_2 ∨  b^{134, 8}_1 ∨  b^{134, 8}_0 ∨ false 
c  in DIMACS:
-20462  20463  20464  0

c  3 does not represent an automaton state.
c    -(-b^{134, 8}_2 ∧  b^{134, 8}_1 ∧  b^{134, 8}_0 ∧ true) 
c  in CNF:
c     b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ false 
c  in DIMACS:
 20462 -20463 -20464  0
c  -3 does not represent an automaton state.
c    -( b^{134, 8}_2 ∧  b^{134, 8}_1 ∧  b^{134, 8}_0 ∧ true) 
c  in CNF:
c    -b^{134, 8}_2 ∨ -b^{134, 8}_1 ∨ -b^{134, 8}_0 ∨ false 
c  in DIMACS:
-20462 -20463 -20464  0

c INIT for k = 135
c    -b^{135, 1}_2
c    -b^{135, 1}_1
c    -b^{135, 1}_0
c  in DIMACS:
-20468 0
-20469 0
-20470 0

c Transitions for k = 135
c i = 1
c  -2+1 --> -1
c    ( b^{135, 1}_2 ∧  b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧  p_135) -> ( b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0)
c  in CNF:
c    -b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨  b^{135, 2}_2
c    -b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_1
c    -b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨  b^{135, 2}_0
c  in DIMACS:
-20468 -20469  20470 -135  20471 0
-20468 -20469  20470 -135 -20472 0
-20468 -20469  20470 -135  20473 0

c  -1+1 --> 0
c    ( b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧  b^{135, 1}_0 ∧  p_135) -> (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧ -b^{135, 2}_0)
c  in CNF:
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_2
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_1
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_0
c  in DIMACS:
-20468  20469 -20470 -135 -20471 0
-20468  20469 -20470 -135 -20472 0
-20468  20469 -20470 -135 -20473 0

c  0+1 --> 1
c    (-b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧  p_135) -> (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0)
c  in CNF:
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_2
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_1
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨  b^{135, 2}_0
c  in DIMACS:
 20468  20469  20470 -135 -20471 0
 20468  20469  20470 -135 -20472 0
 20468  20469  20470 -135  20473 0

c  1+1 --> 2
c    (-b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧  b^{135, 1}_0 ∧  p_135) -> (-b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0)
c  in CNF:
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_2
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨  b^{135, 2}_1
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ -p_135 ∨ -b^{135, 2}_0
c  in DIMACS:
 20468  20469 -20470 -135 -20471 0
 20468  20469 -20470 -135  20472 0
 20468  20469 -20470 -135 -20473 0

c  2+1 --> break 
c    (-b^{135, 1}_2 ∧  b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧  p_135) -> break
c  in CNF:
c     b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ -p_135 ∨ break
c  in DIMACS:
 20468 -20469  20470 -135 1162 0


c  2-1 --> 1
c    (-b^{135, 1}_2 ∧  b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧ -p_135) -> (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0)
c  in CNF:
c     b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_2
c     b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_1
c     b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨  b^{135, 2}_0
c  in DIMACS:
 20468 -20469  20470  135 -20471 0
 20468 -20469  20470  135 -20472 0
 20468 -20469  20470  135  20473 0

c  1-1 --> 0
c    (-b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧  b^{135, 1}_0 ∧ -p_135) -> (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧ -b^{135, 2}_0)
c  in CNF:
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_2
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_1
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_0
c  in DIMACS:
 20468  20469 -20470  135 -20471 0
 20468  20469 -20470  135 -20472 0
 20468  20469 -20470  135 -20473 0

c  0-1 --> -1
c    (-b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧ -p_135) -> ( b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0)
c  in CNF:
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨  b^{135, 2}_2
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_1
c     b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨  b^{135, 2}_0
c  in DIMACS:
 20468  20469  20470  135  20471 0
 20468  20469  20470  135 -20472 0
 20468  20469  20470  135  20473 0

c  -1-1 --> -2
c    ( b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧  b^{135, 1}_0 ∧ -p_135) -> ( b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0)
c  in CNF:
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨  b^{135, 2}_2
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨  b^{135, 2}_1
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨  p_135 ∨ -b^{135, 2}_0
c  in DIMACS:
-20468  20469 -20470  135  20471 0
-20468  20469 -20470  135  20472 0
-20468  20469 -20470  135 -20473 0

c  -2-1 --> break 
c    ( b^{135, 1}_2 ∧  b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧ -p_135) -> break
c  in CNF:
c    -b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨  b^{135, 1}_0 ∨  p_135 ∨ break
c  in DIMACS:
-20468 -20469  20470  135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 1}_2 ∧ -b^{135, 1}_1 ∧ -b^{135, 1}_0 ∧ true) 
c  in CNF:
c    -b^{135, 1}_2 ∨  b^{135, 1}_1 ∨  b^{135, 1}_0 ∨ false 
c  in DIMACS:
-20468  20469  20470  0

c  3 does not represent an automaton state.
c    -(-b^{135, 1}_2 ∧  b^{135, 1}_1 ∧  b^{135, 1}_0 ∧ true) 
c  in CNF:
c     b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ false 
c  in DIMACS:
 20468 -20469 -20470  0
c  -3 does not represent an automaton state.
c    -( b^{135, 1}_2 ∧  b^{135, 1}_1 ∧  b^{135, 1}_0 ∧ true) 
c  in CNF:
c    -b^{135, 1}_2 ∨ -b^{135, 1}_1 ∨ -b^{135, 1}_0 ∨ false 
c  in DIMACS:
-20468 -20469 -20470  0

c i = 2
c  -2+1 --> -1
c    ( b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧  p_270) -> ( b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0)
c  in CNF:
c    -b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨  b^{135, 3}_2
c    -b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_1
c    -b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨  b^{135, 3}_0
c  in DIMACS:
-20471 -20472  20473 -270  20474 0
-20471 -20472  20473 -270 -20475 0
-20471 -20472  20473 -270  20476 0

c  -1+1 --> 0
c    ( b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0 ∧  p_270) -> (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧ -b^{135, 3}_0)
c  in CNF:
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_2
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_1
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_0
c  in DIMACS:
-20471  20472 -20473 -270 -20474 0
-20471  20472 -20473 -270 -20475 0
-20471  20472 -20473 -270 -20476 0

c  0+1 --> 1
c    (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧  p_270) -> (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0)
c  in CNF:
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_2
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_1
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨  b^{135, 3}_0
c  in DIMACS:
 20471  20472  20473 -270 -20474 0
 20471  20472  20473 -270 -20475 0
 20471  20472  20473 -270  20476 0

c  1+1 --> 2
c    (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0 ∧  p_270) -> (-b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0)
c  in CNF:
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_2
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨  b^{135, 3}_1
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ -p_270 ∨ -b^{135, 3}_0
c  in DIMACS:
 20471  20472 -20473 -270 -20474 0
 20471  20472 -20473 -270  20475 0
 20471  20472 -20473 -270 -20476 0

c  2+1 --> break 
c    (-b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧  p_270) -> break
c  in CNF:
c     b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 20471 -20472  20473 -270 1162 0


c  2-1 --> 1
c    (-b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧ -p_270) -> (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0)
c  in CNF:
c     b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_2
c     b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_1
c     b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨  b^{135, 3}_0
c  in DIMACS:
 20471 -20472  20473  270 -20474 0
 20471 -20472  20473  270 -20475 0
 20471 -20472  20473  270  20476 0

c  1-1 --> 0
c    (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0 ∧ -p_270) -> (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧ -b^{135, 3}_0)
c  in CNF:
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_2
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_1
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_0
c  in DIMACS:
 20471  20472 -20473  270 -20474 0
 20471  20472 -20473  270 -20475 0
 20471  20472 -20473  270 -20476 0

c  0-1 --> -1
c    (-b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧ -p_270) -> ( b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0)
c  in CNF:
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨  b^{135, 3}_2
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_1
c     b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨  b^{135, 3}_0
c  in DIMACS:
 20471  20472  20473  270  20474 0
 20471  20472  20473  270 -20475 0
 20471  20472  20473  270  20476 0

c  -1-1 --> -2
c    ( b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧  b^{135, 2}_0 ∧ -p_270) -> ( b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0)
c  in CNF:
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨  b^{135, 3}_2
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨  b^{135, 3}_1
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨  p_270 ∨ -b^{135, 3}_0
c  in DIMACS:
-20471  20472 -20473  270  20474 0
-20471  20472 -20473  270  20475 0
-20471  20472 -20473  270 -20476 0

c  -2-1 --> break 
c    ( b^{135, 2}_2 ∧  b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨  b^{135, 2}_0 ∨  p_270 ∨ break
c  in DIMACS:
-20471 -20472  20473  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 2}_2 ∧ -b^{135, 2}_1 ∧ -b^{135, 2}_0 ∧ true) 
c  in CNF:
c    -b^{135, 2}_2 ∨  b^{135, 2}_1 ∨  b^{135, 2}_0 ∨ false 
c  in DIMACS:
-20471  20472  20473  0

c  3 does not represent an automaton state.
c    -(-b^{135, 2}_2 ∧  b^{135, 2}_1 ∧  b^{135, 2}_0 ∧ true) 
c  in CNF:
c     b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ false 
c  in DIMACS:
 20471 -20472 -20473  0
c  -3 does not represent an automaton state.
c    -( b^{135, 2}_2 ∧  b^{135, 2}_1 ∧  b^{135, 2}_0 ∧ true) 
c  in CNF:
c    -b^{135, 2}_2 ∨ -b^{135, 2}_1 ∨ -b^{135, 2}_0 ∨ false 
c  in DIMACS:
-20471 -20472 -20473  0

c i = 3
c  -2+1 --> -1
c    ( b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧  p_405) -> ( b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0)
c  in CNF:
c    -b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨  b^{135, 4}_2
c    -b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_1
c    -b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨  b^{135, 4}_0
c  in DIMACS:
-20474 -20475  20476 -405  20477 0
-20474 -20475  20476 -405 -20478 0
-20474 -20475  20476 -405  20479 0

c  -1+1 --> 0
c    ( b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0 ∧  p_405) -> (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧ -b^{135, 4}_0)
c  in CNF:
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_2
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_1
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_0
c  in DIMACS:
-20474  20475 -20476 -405 -20477 0
-20474  20475 -20476 -405 -20478 0
-20474  20475 -20476 -405 -20479 0

c  0+1 --> 1
c    (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧  p_405) -> (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0)
c  in CNF:
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_2
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_1
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨  b^{135, 4}_0
c  in DIMACS:
 20474  20475  20476 -405 -20477 0
 20474  20475  20476 -405 -20478 0
 20474  20475  20476 -405  20479 0

c  1+1 --> 2
c    (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0 ∧  p_405) -> (-b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0)
c  in CNF:
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_2
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨  b^{135, 4}_1
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ -p_405 ∨ -b^{135, 4}_0
c  in DIMACS:
 20474  20475 -20476 -405 -20477 0
 20474  20475 -20476 -405  20478 0
 20474  20475 -20476 -405 -20479 0

c  2+1 --> break 
c    (-b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧  p_405) -> break
c  in CNF:
c     b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ -p_405 ∨ break
c  in DIMACS:
 20474 -20475  20476 -405 1162 0


c  2-1 --> 1
c    (-b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧ -p_405) -> (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0)
c  in CNF:
c     b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_2
c     b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_1
c     b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨  b^{135, 4}_0
c  in DIMACS:
 20474 -20475  20476  405 -20477 0
 20474 -20475  20476  405 -20478 0
 20474 -20475  20476  405  20479 0

c  1-1 --> 0
c    (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0 ∧ -p_405) -> (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧ -b^{135, 4}_0)
c  in CNF:
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_2
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_1
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_0
c  in DIMACS:
 20474  20475 -20476  405 -20477 0
 20474  20475 -20476  405 -20478 0
 20474  20475 -20476  405 -20479 0

c  0-1 --> -1
c    (-b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧ -p_405) -> ( b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0)
c  in CNF:
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨  b^{135, 4}_2
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_1
c     b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨  b^{135, 4}_0
c  in DIMACS:
 20474  20475  20476  405  20477 0
 20474  20475  20476  405 -20478 0
 20474  20475  20476  405  20479 0

c  -1-1 --> -2
c    ( b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧  b^{135, 3}_0 ∧ -p_405) -> ( b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0)
c  in CNF:
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨  b^{135, 4}_2
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨  b^{135, 4}_1
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨  p_405 ∨ -b^{135, 4}_0
c  in DIMACS:
-20474  20475 -20476  405  20477 0
-20474  20475 -20476  405  20478 0
-20474  20475 -20476  405 -20479 0

c  -2-1 --> break 
c    ( b^{135, 3}_2 ∧  b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧ -p_405) -> break
c  in CNF:
c    -b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨  b^{135, 3}_0 ∨  p_405 ∨ break
c  in DIMACS:
-20474 -20475  20476  405 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 3}_2 ∧ -b^{135, 3}_1 ∧ -b^{135, 3}_0 ∧ true) 
c  in CNF:
c    -b^{135, 3}_2 ∨  b^{135, 3}_1 ∨  b^{135, 3}_0 ∨ false 
c  in DIMACS:
-20474  20475  20476  0

c  3 does not represent an automaton state.
c    -(-b^{135, 3}_2 ∧  b^{135, 3}_1 ∧  b^{135, 3}_0 ∧ true) 
c  in CNF:
c     b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ false 
c  in DIMACS:
 20474 -20475 -20476  0
c  -3 does not represent an automaton state.
c    -( b^{135, 3}_2 ∧  b^{135, 3}_1 ∧  b^{135, 3}_0 ∧ true) 
c  in CNF:
c    -b^{135, 3}_2 ∨ -b^{135, 3}_1 ∨ -b^{135, 3}_0 ∨ false 
c  in DIMACS:
-20474 -20475 -20476  0

c i = 4
c  -2+1 --> -1
c    ( b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧  p_540) -> ( b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0)
c  in CNF:
c    -b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨  b^{135, 5}_2
c    -b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_1
c    -b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨  b^{135, 5}_0
c  in DIMACS:
-20477 -20478  20479 -540  20480 0
-20477 -20478  20479 -540 -20481 0
-20477 -20478  20479 -540  20482 0

c  -1+1 --> 0
c    ( b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0 ∧  p_540) -> (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧ -b^{135, 5}_0)
c  in CNF:
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_2
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_1
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_0
c  in DIMACS:
-20477  20478 -20479 -540 -20480 0
-20477  20478 -20479 -540 -20481 0
-20477  20478 -20479 -540 -20482 0

c  0+1 --> 1
c    (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧  p_540) -> (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0)
c  in CNF:
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_2
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_1
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨  b^{135, 5}_0
c  in DIMACS:
 20477  20478  20479 -540 -20480 0
 20477  20478  20479 -540 -20481 0
 20477  20478  20479 -540  20482 0

c  1+1 --> 2
c    (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0 ∧  p_540) -> (-b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0)
c  in CNF:
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_2
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨  b^{135, 5}_1
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ -p_540 ∨ -b^{135, 5}_0
c  in DIMACS:
 20477  20478 -20479 -540 -20480 0
 20477  20478 -20479 -540  20481 0
 20477  20478 -20479 -540 -20482 0

c  2+1 --> break 
c    (-b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧  p_540) -> break
c  in CNF:
c     b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 20477 -20478  20479 -540 1162 0


c  2-1 --> 1
c    (-b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧ -p_540) -> (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0)
c  in CNF:
c     b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_2
c     b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_1
c     b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨  b^{135, 5}_0
c  in DIMACS:
 20477 -20478  20479  540 -20480 0
 20477 -20478  20479  540 -20481 0
 20477 -20478  20479  540  20482 0

c  1-1 --> 0
c    (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0 ∧ -p_540) -> (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧ -b^{135, 5}_0)
c  in CNF:
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_2
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_1
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_0
c  in DIMACS:
 20477  20478 -20479  540 -20480 0
 20477  20478 -20479  540 -20481 0
 20477  20478 -20479  540 -20482 0

c  0-1 --> -1
c    (-b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧ -p_540) -> ( b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0)
c  in CNF:
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨  b^{135, 5}_2
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_1
c     b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨  b^{135, 5}_0
c  in DIMACS:
 20477  20478  20479  540  20480 0
 20477  20478  20479  540 -20481 0
 20477  20478  20479  540  20482 0

c  -1-1 --> -2
c    ( b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧  b^{135, 4}_0 ∧ -p_540) -> ( b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0)
c  in CNF:
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨  b^{135, 5}_2
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨  b^{135, 5}_1
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨  p_540 ∨ -b^{135, 5}_0
c  in DIMACS:
-20477  20478 -20479  540  20480 0
-20477  20478 -20479  540  20481 0
-20477  20478 -20479  540 -20482 0

c  -2-1 --> break 
c    ( b^{135, 4}_2 ∧  b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨  b^{135, 4}_0 ∨  p_540 ∨ break
c  in DIMACS:
-20477 -20478  20479  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 4}_2 ∧ -b^{135, 4}_1 ∧ -b^{135, 4}_0 ∧ true) 
c  in CNF:
c    -b^{135, 4}_2 ∨  b^{135, 4}_1 ∨  b^{135, 4}_0 ∨ false 
c  in DIMACS:
-20477  20478  20479  0

c  3 does not represent an automaton state.
c    -(-b^{135, 4}_2 ∧  b^{135, 4}_1 ∧  b^{135, 4}_0 ∧ true) 
c  in CNF:
c     b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ false 
c  in DIMACS:
 20477 -20478 -20479  0
c  -3 does not represent an automaton state.
c    -( b^{135, 4}_2 ∧  b^{135, 4}_1 ∧  b^{135, 4}_0 ∧ true) 
c  in CNF:
c    -b^{135, 4}_2 ∨ -b^{135, 4}_1 ∨ -b^{135, 4}_0 ∨ false 
c  in DIMACS:
-20477 -20478 -20479  0

c i = 5
c  -2+1 --> -1
c    ( b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧  p_675) -> ( b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0)
c  in CNF:
c    -b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨  b^{135, 6}_2
c    -b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_1
c    -b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨  b^{135, 6}_0
c  in DIMACS:
-20480 -20481  20482 -675  20483 0
-20480 -20481  20482 -675 -20484 0
-20480 -20481  20482 -675  20485 0

c  -1+1 --> 0
c    ( b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0 ∧  p_675) -> (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧ -b^{135, 6}_0)
c  in CNF:
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_2
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_1
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_0
c  in DIMACS:
-20480  20481 -20482 -675 -20483 0
-20480  20481 -20482 -675 -20484 0
-20480  20481 -20482 -675 -20485 0

c  0+1 --> 1
c    (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧  p_675) -> (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0)
c  in CNF:
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_2
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_1
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨  b^{135, 6}_0
c  in DIMACS:
 20480  20481  20482 -675 -20483 0
 20480  20481  20482 -675 -20484 0
 20480  20481  20482 -675  20485 0

c  1+1 --> 2
c    (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0 ∧  p_675) -> (-b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0)
c  in CNF:
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_2
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨  b^{135, 6}_1
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ -p_675 ∨ -b^{135, 6}_0
c  in DIMACS:
 20480  20481 -20482 -675 -20483 0
 20480  20481 -20482 -675  20484 0
 20480  20481 -20482 -675 -20485 0

c  2+1 --> break 
c    (-b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧  p_675) -> break
c  in CNF:
c     b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 20480 -20481  20482 -675 1162 0


c  2-1 --> 1
c    (-b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧ -p_675) -> (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0)
c  in CNF:
c     b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_2
c     b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_1
c     b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨  b^{135, 6}_0
c  in DIMACS:
 20480 -20481  20482  675 -20483 0
 20480 -20481  20482  675 -20484 0
 20480 -20481  20482  675  20485 0

c  1-1 --> 0
c    (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0 ∧ -p_675) -> (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧ -b^{135, 6}_0)
c  in CNF:
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_2
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_1
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_0
c  in DIMACS:
 20480  20481 -20482  675 -20483 0
 20480  20481 -20482  675 -20484 0
 20480  20481 -20482  675 -20485 0

c  0-1 --> -1
c    (-b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧ -p_675) -> ( b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0)
c  in CNF:
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨  b^{135, 6}_2
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_1
c     b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨  b^{135, 6}_0
c  in DIMACS:
 20480  20481  20482  675  20483 0
 20480  20481  20482  675 -20484 0
 20480  20481  20482  675  20485 0

c  -1-1 --> -2
c    ( b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧  b^{135, 5}_0 ∧ -p_675) -> ( b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0)
c  in CNF:
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨  b^{135, 6}_2
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨  b^{135, 6}_1
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨  p_675 ∨ -b^{135, 6}_0
c  in DIMACS:
-20480  20481 -20482  675  20483 0
-20480  20481 -20482  675  20484 0
-20480  20481 -20482  675 -20485 0

c  -2-1 --> break 
c    ( b^{135, 5}_2 ∧  b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨  b^{135, 5}_0 ∨  p_675 ∨ break
c  in DIMACS:
-20480 -20481  20482  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 5}_2 ∧ -b^{135, 5}_1 ∧ -b^{135, 5}_0 ∧ true) 
c  in CNF:
c    -b^{135, 5}_2 ∨  b^{135, 5}_1 ∨  b^{135, 5}_0 ∨ false 
c  in DIMACS:
-20480  20481  20482  0

c  3 does not represent an automaton state.
c    -(-b^{135, 5}_2 ∧  b^{135, 5}_1 ∧  b^{135, 5}_0 ∧ true) 
c  in CNF:
c     b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ false 
c  in DIMACS:
 20480 -20481 -20482  0
c  -3 does not represent an automaton state.
c    -( b^{135, 5}_2 ∧  b^{135, 5}_1 ∧  b^{135, 5}_0 ∧ true) 
c  in CNF:
c    -b^{135, 5}_2 ∨ -b^{135, 5}_1 ∨ -b^{135, 5}_0 ∨ false 
c  in DIMACS:
-20480 -20481 -20482  0

c i = 6
c  -2+1 --> -1
c    ( b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧  p_810) -> ( b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0)
c  in CNF:
c    -b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨  b^{135, 7}_2
c    -b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_1
c    -b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨  b^{135, 7}_0
c  in DIMACS:
-20483 -20484  20485 -810  20486 0
-20483 -20484  20485 -810 -20487 0
-20483 -20484  20485 -810  20488 0

c  -1+1 --> 0
c    ( b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0 ∧  p_810) -> (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧ -b^{135, 7}_0)
c  in CNF:
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_2
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_1
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_0
c  in DIMACS:
-20483  20484 -20485 -810 -20486 0
-20483  20484 -20485 -810 -20487 0
-20483  20484 -20485 -810 -20488 0

c  0+1 --> 1
c    (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧  p_810) -> (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0)
c  in CNF:
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_2
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_1
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨  b^{135, 7}_0
c  in DIMACS:
 20483  20484  20485 -810 -20486 0
 20483  20484  20485 -810 -20487 0
 20483  20484  20485 -810  20488 0

c  1+1 --> 2
c    (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0 ∧  p_810) -> (-b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0)
c  in CNF:
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_2
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨  b^{135, 7}_1
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ -p_810 ∨ -b^{135, 7}_0
c  in DIMACS:
 20483  20484 -20485 -810 -20486 0
 20483  20484 -20485 -810  20487 0
 20483  20484 -20485 -810 -20488 0

c  2+1 --> break 
c    (-b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧  p_810) -> break
c  in CNF:
c     b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 20483 -20484  20485 -810 1162 0


c  2-1 --> 1
c    (-b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧ -p_810) -> (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0)
c  in CNF:
c     b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_2
c     b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_1
c     b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨  b^{135, 7}_0
c  in DIMACS:
 20483 -20484  20485  810 -20486 0
 20483 -20484  20485  810 -20487 0
 20483 -20484  20485  810  20488 0

c  1-1 --> 0
c    (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0 ∧ -p_810) -> (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧ -b^{135, 7}_0)
c  in CNF:
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_2
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_1
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_0
c  in DIMACS:
 20483  20484 -20485  810 -20486 0
 20483  20484 -20485  810 -20487 0
 20483  20484 -20485  810 -20488 0

c  0-1 --> -1
c    (-b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧ -p_810) -> ( b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0)
c  in CNF:
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨  b^{135, 7}_2
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_1
c     b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨  b^{135, 7}_0
c  in DIMACS:
 20483  20484  20485  810  20486 0
 20483  20484  20485  810 -20487 0
 20483  20484  20485  810  20488 0

c  -1-1 --> -2
c    ( b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧  b^{135, 6}_0 ∧ -p_810) -> ( b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0)
c  in CNF:
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨  b^{135, 7}_2
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨  b^{135, 7}_1
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨  p_810 ∨ -b^{135, 7}_0
c  in DIMACS:
-20483  20484 -20485  810  20486 0
-20483  20484 -20485  810  20487 0
-20483  20484 -20485  810 -20488 0

c  -2-1 --> break 
c    ( b^{135, 6}_2 ∧  b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨  b^{135, 6}_0 ∨  p_810 ∨ break
c  in DIMACS:
-20483 -20484  20485  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 6}_2 ∧ -b^{135, 6}_1 ∧ -b^{135, 6}_0 ∧ true) 
c  in CNF:
c    -b^{135, 6}_2 ∨  b^{135, 6}_1 ∨  b^{135, 6}_0 ∨ false 
c  in DIMACS:
-20483  20484  20485  0

c  3 does not represent an automaton state.
c    -(-b^{135, 6}_2 ∧  b^{135, 6}_1 ∧  b^{135, 6}_0 ∧ true) 
c  in CNF:
c     b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ false 
c  in DIMACS:
 20483 -20484 -20485  0
c  -3 does not represent an automaton state.
c    -( b^{135, 6}_2 ∧  b^{135, 6}_1 ∧  b^{135, 6}_0 ∧ true) 
c  in CNF:
c    -b^{135, 6}_2 ∨ -b^{135, 6}_1 ∨ -b^{135, 6}_0 ∨ false 
c  in DIMACS:
-20483 -20484 -20485  0

c i = 7
c  -2+1 --> -1
c    ( b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧  p_945) -> ( b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0)
c  in CNF:
c    -b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨  b^{135, 8}_2
c    -b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_1
c    -b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨  b^{135, 8}_0
c  in DIMACS:
-20486 -20487  20488 -945  20489 0
-20486 -20487  20488 -945 -20490 0
-20486 -20487  20488 -945  20491 0

c  -1+1 --> 0
c    ( b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0 ∧  p_945) -> (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧ -b^{135, 8}_0)
c  in CNF:
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_2
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_1
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_0
c  in DIMACS:
-20486  20487 -20488 -945 -20489 0
-20486  20487 -20488 -945 -20490 0
-20486  20487 -20488 -945 -20491 0

c  0+1 --> 1
c    (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧  p_945) -> (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0)
c  in CNF:
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_2
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_1
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨  b^{135, 8}_0
c  in DIMACS:
 20486  20487  20488 -945 -20489 0
 20486  20487  20488 -945 -20490 0
 20486  20487  20488 -945  20491 0

c  1+1 --> 2
c    (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0 ∧  p_945) -> (-b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0)
c  in CNF:
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_2
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨  b^{135, 8}_1
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ -p_945 ∨ -b^{135, 8}_0
c  in DIMACS:
 20486  20487 -20488 -945 -20489 0
 20486  20487 -20488 -945  20490 0
 20486  20487 -20488 -945 -20491 0

c  2+1 --> break 
c    (-b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧  p_945) -> break
c  in CNF:
c     b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 20486 -20487  20488 -945 1162 0


c  2-1 --> 1
c    (-b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧ -p_945) -> (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0)
c  in CNF:
c     b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_2
c     b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_1
c     b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨  b^{135, 8}_0
c  in DIMACS:
 20486 -20487  20488  945 -20489 0
 20486 -20487  20488  945 -20490 0
 20486 -20487  20488  945  20491 0

c  1-1 --> 0
c    (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0 ∧ -p_945) -> (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧ -b^{135, 8}_0)
c  in CNF:
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_2
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_1
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_0
c  in DIMACS:
 20486  20487 -20488  945 -20489 0
 20486  20487 -20488  945 -20490 0
 20486  20487 -20488  945 -20491 0

c  0-1 --> -1
c    (-b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧ -p_945) -> ( b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0)
c  in CNF:
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨  b^{135, 8}_2
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_1
c     b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨  b^{135, 8}_0
c  in DIMACS:
 20486  20487  20488  945  20489 0
 20486  20487  20488  945 -20490 0
 20486  20487  20488  945  20491 0

c  -1-1 --> -2
c    ( b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧  b^{135, 7}_0 ∧ -p_945) -> ( b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0)
c  in CNF:
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨  b^{135, 8}_2
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨  b^{135, 8}_1
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨  p_945 ∨ -b^{135, 8}_0
c  in DIMACS:
-20486  20487 -20488  945  20489 0
-20486  20487 -20488  945  20490 0
-20486  20487 -20488  945 -20491 0

c  -2-1 --> break 
c    ( b^{135, 7}_2 ∧  b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨  b^{135, 7}_0 ∨  p_945 ∨ break
c  in DIMACS:
-20486 -20487  20488  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 7}_2 ∧ -b^{135, 7}_1 ∧ -b^{135, 7}_0 ∧ true) 
c  in CNF:
c    -b^{135, 7}_2 ∨  b^{135, 7}_1 ∨  b^{135, 7}_0 ∨ false 
c  in DIMACS:
-20486  20487  20488  0

c  3 does not represent an automaton state.
c    -(-b^{135, 7}_2 ∧  b^{135, 7}_1 ∧  b^{135, 7}_0 ∧ true) 
c  in CNF:
c     b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ false 
c  in DIMACS:
 20486 -20487 -20488  0
c  -3 does not represent an automaton state.
c    -( b^{135, 7}_2 ∧  b^{135, 7}_1 ∧  b^{135, 7}_0 ∧ true) 
c  in CNF:
c    -b^{135, 7}_2 ∨ -b^{135, 7}_1 ∨ -b^{135, 7}_0 ∨ false 
c  in DIMACS:
-20486 -20487 -20488  0

c i = 8
c  -2+1 --> -1
c    ( b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧  p_1080) -> ( b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧  b^{135, 9}_0)
c  in CNF:
c    -b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨  b^{135, 9}_2
c    -b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_1
c    -b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨  b^{135, 9}_0
c  in DIMACS:
-20489 -20490  20491 -1080  20492 0
-20489 -20490  20491 -1080 -20493 0
-20489 -20490  20491 -1080  20494 0

c  -1+1 --> 0
c    ( b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0 ∧  p_1080) -> (-b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧ -b^{135, 9}_0)
c  in CNF:
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_2
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_1
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_0
c  in DIMACS:
-20489  20490 -20491 -1080 -20492 0
-20489  20490 -20491 -1080 -20493 0
-20489  20490 -20491 -1080 -20494 0

c  0+1 --> 1
c    (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧  p_1080) -> (-b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧  b^{135, 9}_0)
c  in CNF:
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_2
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_1
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨  b^{135, 9}_0
c  in DIMACS:
 20489  20490  20491 -1080 -20492 0
 20489  20490  20491 -1080 -20493 0
 20489  20490  20491 -1080  20494 0

c  1+1 --> 2
c    (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0 ∧  p_1080) -> (-b^{135, 9}_2 ∧  b^{135, 9}_1 ∧ -b^{135, 9}_0)
c  in CNF:
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_2
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨  b^{135, 9}_1
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ -p_1080 ∨ -b^{135, 9}_0
c  in DIMACS:
 20489  20490 -20491 -1080 -20492 0
 20489  20490 -20491 -1080  20493 0
 20489  20490 -20491 -1080 -20494 0

c  2+1 --> break 
c    (-b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 20489 -20490  20491 -1080 1162 0


c  2-1 --> 1
c    (-b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧ -p_1080) -> (-b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧  b^{135, 9}_0)
c  in CNF:
c     b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_2
c     b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_1
c     b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨  b^{135, 9}_0
c  in DIMACS:
 20489 -20490  20491  1080 -20492 0
 20489 -20490  20491  1080 -20493 0
 20489 -20490  20491  1080  20494 0

c  1-1 --> 0
c    (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0 ∧ -p_1080) -> (-b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧ -b^{135, 9}_0)
c  in CNF:
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_2
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_1
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_0
c  in DIMACS:
 20489  20490 -20491  1080 -20492 0
 20489  20490 -20491  1080 -20493 0
 20489  20490 -20491  1080 -20494 0

c  0-1 --> -1
c    (-b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧ -p_1080) -> ( b^{135, 9}_2 ∧ -b^{135, 9}_1 ∧  b^{135, 9}_0)
c  in CNF:
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨  b^{135, 9}_2
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_1
c     b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨  b^{135, 9}_0
c  in DIMACS:
 20489  20490  20491  1080  20492 0
 20489  20490  20491  1080 -20493 0
 20489  20490  20491  1080  20494 0

c  -1-1 --> -2
c    ( b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧  b^{135, 8}_0 ∧ -p_1080) -> ( b^{135, 9}_2 ∧  b^{135, 9}_1 ∧ -b^{135, 9}_0)
c  in CNF:
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨  b^{135, 9}_2
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨  b^{135, 9}_1
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨  p_1080 ∨ -b^{135, 9}_0
c  in DIMACS:
-20489  20490 -20491  1080  20492 0
-20489  20490 -20491  1080  20493 0
-20489  20490 -20491  1080 -20494 0

c  -2-1 --> break 
c    ( b^{135, 8}_2 ∧  b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨  b^{135, 8}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-20489 -20490  20491  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{135, 8}_2 ∧ -b^{135, 8}_1 ∧ -b^{135, 8}_0 ∧ true) 
c  in CNF:
c    -b^{135, 8}_2 ∨  b^{135, 8}_1 ∨  b^{135, 8}_0 ∨ false 
c  in DIMACS:
-20489  20490  20491  0

c  3 does not represent an automaton state.
c    -(-b^{135, 8}_2 ∧  b^{135, 8}_1 ∧  b^{135, 8}_0 ∧ true) 
c  in CNF:
c     b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ false 
c  in DIMACS:
 20489 -20490 -20491  0
c  -3 does not represent an automaton state.
c    -( b^{135, 8}_2 ∧  b^{135, 8}_1 ∧  b^{135, 8}_0 ∧ true) 
c  in CNF:
c    -b^{135, 8}_2 ∨ -b^{135, 8}_1 ∨ -b^{135, 8}_0 ∨ false 
c  in DIMACS:
-20489 -20490 -20491  0

c INIT for k = 136
c    -b^{136, 1}_2
c    -b^{136, 1}_1
c    -b^{136, 1}_0
c  in DIMACS:
-20495 0
-20496 0
-20497 0

c Transitions for k = 136
c i = 1
c  -2+1 --> -1
c    ( b^{136, 1}_2 ∧  b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧  p_136) -> ( b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0)
c  in CNF:
c    -b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨  b^{136, 2}_2
c    -b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_1
c    -b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨  b^{136, 2}_0
c  in DIMACS:
-20495 -20496  20497 -136  20498 0
-20495 -20496  20497 -136 -20499 0
-20495 -20496  20497 -136  20500 0

c  -1+1 --> 0
c    ( b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧  b^{136, 1}_0 ∧  p_136) -> (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧ -b^{136, 2}_0)
c  in CNF:
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_2
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_1
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_0
c  in DIMACS:
-20495  20496 -20497 -136 -20498 0
-20495  20496 -20497 -136 -20499 0
-20495  20496 -20497 -136 -20500 0

c  0+1 --> 1
c    (-b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧  p_136) -> (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0)
c  in CNF:
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_2
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_1
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨  b^{136, 2}_0
c  in DIMACS:
 20495  20496  20497 -136 -20498 0
 20495  20496  20497 -136 -20499 0
 20495  20496  20497 -136  20500 0

c  1+1 --> 2
c    (-b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧  b^{136, 1}_0 ∧  p_136) -> (-b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0)
c  in CNF:
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_2
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨  b^{136, 2}_1
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ -p_136 ∨ -b^{136, 2}_0
c  in DIMACS:
 20495  20496 -20497 -136 -20498 0
 20495  20496 -20497 -136  20499 0
 20495  20496 -20497 -136 -20500 0

c  2+1 --> break 
c    (-b^{136, 1}_2 ∧  b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧  p_136) -> break
c  in CNF:
c     b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ -p_136 ∨ break
c  in DIMACS:
 20495 -20496  20497 -136 1162 0


c  2-1 --> 1
c    (-b^{136, 1}_2 ∧  b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧ -p_136) -> (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0)
c  in CNF:
c     b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_2
c     b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_1
c     b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨  b^{136, 2}_0
c  in DIMACS:
 20495 -20496  20497  136 -20498 0
 20495 -20496  20497  136 -20499 0
 20495 -20496  20497  136  20500 0

c  1-1 --> 0
c    (-b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧  b^{136, 1}_0 ∧ -p_136) -> (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧ -b^{136, 2}_0)
c  in CNF:
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_2
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_1
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_0
c  in DIMACS:
 20495  20496 -20497  136 -20498 0
 20495  20496 -20497  136 -20499 0
 20495  20496 -20497  136 -20500 0

c  0-1 --> -1
c    (-b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧ -p_136) -> ( b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0)
c  in CNF:
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨  b^{136, 2}_2
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_1
c     b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨  b^{136, 2}_0
c  in DIMACS:
 20495  20496  20497  136  20498 0
 20495  20496  20497  136 -20499 0
 20495  20496  20497  136  20500 0

c  -1-1 --> -2
c    ( b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧  b^{136, 1}_0 ∧ -p_136) -> ( b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0)
c  in CNF:
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨  b^{136, 2}_2
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨  b^{136, 2}_1
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨  p_136 ∨ -b^{136, 2}_0
c  in DIMACS:
-20495  20496 -20497  136  20498 0
-20495  20496 -20497  136  20499 0
-20495  20496 -20497  136 -20500 0

c  -2-1 --> break 
c    ( b^{136, 1}_2 ∧  b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧ -p_136) -> break
c  in CNF:
c    -b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨  b^{136, 1}_0 ∨  p_136 ∨ break
c  in DIMACS:
-20495 -20496  20497  136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 1}_2 ∧ -b^{136, 1}_1 ∧ -b^{136, 1}_0 ∧ true) 
c  in CNF:
c    -b^{136, 1}_2 ∨  b^{136, 1}_1 ∨  b^{136, 1}_0 ∨ false 
c  in DIMACS:
-20495  20496  20497  0

c  3 does not represent an automaton state.
c    -(-b^{136, 1}_2 ∧  b^{136, 1}_1 ∧  b^{136, 1}_0 ∧ true) 
c  in CNF:
c     b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ false 
c  in DIMACS:
 20495 -20496 -20497  0
c  -3 does not represent an automaton state.
c    -( b^{136, 1}_2 ∧  b^{136, 1}_1 ∧  b^{136, 1}_0 ∧ true) 
c  in CNF:
c    -b^{136, 1}_2 ∨ -b^{136, 1}_1 ∨ -b^{136, 1}_0 ∨ false 
c  in DIMACS:
-20495 -20496 -20497  0

c i = 2
c  -2+1 --> -1
c    ( b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧  p_272) -> ( b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0)
c  in CNF:
c    -b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨  b^{136, 3}_2
c    -b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_1
c    -b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨  b^{136, 3}_0
c  in DIMACS:
-20498 -20499  20500 -272  20501 0
-20498 -20499  20500 -272 -20502 0
-20498 -20499  20500 -272  20503 0

c  -1+1 --> 0
c    ( b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0 ∧  p_272) -> (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧ -b^{136, 3}_0)
c  in CNF:
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_2
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_1
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_0
c  in DIMACS:
-20498  20499 -20500 -272 -20501 0
-20498  20499 -20500 -272 -20502 0
-20498  20499 -20500 -272 -20503 0

c  0+1 --> 1
c    (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧  p_272) -> (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0)
c  in CNF:
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_2
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_1
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨  b^{136, 3}_0
c  in DIMACS:
 20498  20499  20500 -272 -20501 0
 20498  20499  20500 -272 -20502 0
 20498  20499  20500 -272  20503 0

c  1+1 --> 2
c    (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0 ∧  p_272) -> (-b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0)
c  in CNF:
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_2
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨  b^{136, 3}_1
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ -p_272 ∨ -b^{136, 3}_0
c  in DIMACS:
 20498  20499 -20500 -272 -20501 0
 20498  20499 -20500 -272  20502 0
 20498  20499 -20500 -272 -20503 0

c  2+1 --> break 
c    (-b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧  p_272) -> break
c  in CNF:
c     b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 20498 -20499  20500 -272 1162 0


c  2-1 --> 1
c    (-b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧ -p_272) -> (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0)
c  in CNF:
c     b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_2
c     b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_1
c     b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨  b^{136, 3}_0
c  in DIMACS:
 20498 -20499  20500  272 -20501 0
 20498 -20499  20500  272 -20502 0
 20498 -20499  20500  272  20503 0

c  1-1 --> 0
c    (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0 ∧ -p_272) -> (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧ -b^{136, 3}_0)
c  in CNF:
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_2
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_1
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_0
c  in DIMACS:
 20498  20499 -20500  272 -20501 0
 20498  20499 -20500  272 -20502 0
 20498  20499 -20500  272 -20503 0

c  0-1 --> -1
c    (-b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧ -p_272) -> ( b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0)
c  in CNF:
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨  b^{136, 3}_2
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_1
c     b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨  b^{136, 3}_0
c  in DIMACS:
 20498  20499  20500  272  20501 0
 20498  20499  20500  272 -20502 0
 20498  20499  20500  272  20503 0

c  -1-1 --> -2
c    ( b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧  b^{136, 2}_0 ∧ -p_272) -> ( b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0)
c  in CNF:
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨  b^{136, 3}_2
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨  b^{136, 3}_1
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨  p_272 ∨ -b^{136, 3}_0
c  in DIMACS:
-20498  20499 -20500  272  20501 0
-20498  20499 -20500  272  20502 0
-20498  20499 -20500  272 -20503 0

c  -2-1 --> break 
c    ( b^{136, 2}_2 ∧  b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨  b^{136, 2}_0 ∨  p_272 ∨ break
c  in DIMACS:
-20498 -20499  20500  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 2}_2 ∧ -b^{136, 2}_1 ∧ -b^{136, 2}_0 ∧ true) 
c  in CNF:
c    -b^{136, 2}_2 ∨  b^{136, 2}_1 ∨  b^{136, 2}_0 ∨ false 
c  in DIMACS:
-20498  20499  20500  0

c  3 does not represent an automaton state.
c    -(-b^{136, 2}_2 ∧  b^{136, 2}_1 ∧  b^{136, 2}_0 ∧ true) 
c  in CNF:
c     b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ false 
c  in DIMACS:
 20498 -20499 -20500  0
c  -3 does not represent an automaton state.
c    -( b^{136, 2}_2 ∧  b^{136, 2}_1 ∧  b^{136, 2}_0 ∧ true) 
c  in CNF:
c    -b^{136, 2}_2 ∨ -b^{136, 2}_1 ∨ -b^{136, 2}_0 ∨ false 
c  in DIMACS:
-20498 -20499 -20500  0

c i = 3
c  -2+1 --> -1
c    ( b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧  p_408) -> ( b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0)
c  in CNF:
c    -b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨  b^{136, 4}_2
c    -b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_1
c    -b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨  b^{136, 4}_0
c  in DIMACS:
-20501 -20502  20503 -408  20504 0
-20501 -20502  20503 -408 -20505 0
-20501 -20502  20503 -408  20506 0

c  -1+1 --> 0
c    ( b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0 ∧  p_408) -> (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧ -b^{136, 4}_0)
c  in CNF:
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_2
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_1
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_0
c  in DIMACS:
-20501  20502 -20503 -408 -20504 0
-20501  20502 -20503 -408 -20505 0
-20501  20502 -20503 -408 -20506 0

c  0+1 --> 1
c    (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧  p_408) -> (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0)
c  in CNF:
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_2
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_1
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨  b^{136, 4}_0
c  in DIMACS:
 20501  20502  20503 -408 -20504 0
 20501  20502  20503 -408 -20505 0
 20501  20502  20503 -408  20506 0

c  1+1 --> 2
c    (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0 ∧  p_408) -> (-b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0)
c  in CNF:
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_2
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨  b^{136, 4}_1
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ -p_408 ∨ -b^{136, 4}_0
c  in DIMACS:
 20501  20502 -20503 -408 -20504 0
 20501  20502 -20503 -408  20505 0
 20501  20502 -20503 -408 -20506 0

c  2+1 --> break 
c    (-b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧  p_408) -> break
c  in CNF:
c     b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 20501 -20502  20503 -408 1162 0


c  2-1 --> 1
c    (-b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧ -p_408) -> (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0)
c  in CNF:
c     b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_2
c     b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_1
c     b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨  b^{136, 4}_0
c  in DIMACS:
 20501 -20502  20503  408 -20504 0
 20501 -20502  20503  408 -20505 0
 20501 -20502  20503  408  20506 0

c  1-1 --> 0
c    (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0 ∧ -p_408) -> (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧ -b^{136, 4}_0)
c  in CNF:
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_2
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_1
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_0
c  in DIMACS:
 20501  20502 -20503  408 -20504 0
 20501  20502 -20503  408 -20505 0
 20501  20502 -20503  408 -20506 0

c  0-1 --> -1
c    (-b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧ -p_408) -> ( b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0)
c  in CNF:
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨  b^{136, 4}_2
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_1
c     b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨  b^{136, 4}_0
c  in DIMACS:
 20501  20502  20503  408  20504 0
 20501  20502  20503  408 -20505 0
 20501  20502  20503  408  20506 0

c  -1-1 --> -2
c    ( b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧  b^{136, 3}_0 ∧ -p_408) -> ( b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0)
c  in CNF:
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨  b^{136, 4}_2
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨  b^{136, 4}_1
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨  p_408 ∨ -b^{136, 4}_0
c  in DIMACS:
-20501  20502 -20503  408  20504 0
-20501  20502 -20503  408  20505 0
-20501  20502 -20503  408 -20506 0

c  -2-1 --> break 
c    ( b^{136, 3}_2 ∧  b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨  b^{136, 3}_0 ∨  p_408 ∨ break
c  in DIMACS:
-20501 -20502  20503  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 3}_2 ∧ -b^{136, 3}_1 ∧ -b^{136, 3}_0 ∧ true) 
c  in CNF:
c    -b^{136, 3}_2 ∨  b^{136, 3}_1 ∨  b^{136, 3}_0 ∨ false 
c  in DIMACS:
-20501  20502  20503  0

c  3 does not represent an automaton state.
c    -(-b^{136, 3}_2 ∧  b^{136, 3}_1 ∧  b^{136, 3}_0 ∧ true) 
c  in CNF:
c     b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ false 
c  in DIMACS:
 20501 -20502 -20503  0
c  -3 does not represent an automaton state.
c    -( b^{136, 3}_2 ∧  b^{136, 3}_1 ∧  b^{136, 3}_0 ∧ true) 
c  in CNF:
c    -b^{136, 3}_2 ∨ -b^{136, 3}_1 ∨ -b^{136, 3}_0 ∨ false 
c  in DIMACS:
-20501 -20502 -20503  0

c i = 4
c  -2+1 --> -1
c    ( b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧  p_544) -> ( b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0)
c  in CNF:
c    -b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨  b^{136, 5}_2
c    -b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_1
c    -b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨  b^{136, 5}_0
c  in DIMACS:
-20504 -20505  20506 -544  20507 0
-20504 -20505  20506 -544 -20508 0
-20504 -20505  20506 -544  20509 0

c  -1+1 --> 0
c    ( b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0 ∧  p_544) -> (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧ -b^{136, 5}_0)
c  in CNF:
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_2
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_1
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_0
c  in DIMACS:
-20504  20505 -20506 -544 -20507 0
-20504  20505 -20506 -544 -20508 0
-20504  20505 -20506 -544 -20509 0

c  0+1 --> 1
c    (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧  p_544) -> (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0)
c  in CNF:
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_2
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_1
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨  b^{136, 5}_0
c  in DIMACS:
 20504  20505  20506 -544 -20507 0
 20504  20505  20506 -544 -20508 0
 20504  20505  20506 -544  20509 0

c  1+1 --> 2
c    (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0 ∧  p_544) -> (-b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0)
c  in CNF:
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_2
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨  b^{136, 5}_1
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ -p_544 ∨ -b^{136, 5}_0
c  in DIMACS:
 20504  20505 -20506 -544 -20507 0
 20504  20505 -20506 -544  20508 0
 20504  20505 -20506 -544 -20509 0

c  2+1 --> break 
c    (-b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧  p_544) -> break
c  in CNF:
c     b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 20504 -20505  20506 -544 1162 0


c  2-1 --> 1
c    (-b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧ -p_544) -> (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0)
c  in CNF:
c     b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_2
c     b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_1
c     b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨  b^{136, 5}_0
c  in DIMACS:
 20504 -20505  20506  544 -20507 0
 20504 -20505  20506  544 -20508 0
 20504 -20505  20506  544  20509 0

c  1-1 --> 0
c    (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0 ∧ -p_544) -> (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧ -b^{136, 5}_0)
c  in CNF:
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_2
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_1
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_0
c  in DIMACS:
 20504  20505 -20506  544 -20507 0
 20504  20505 -20506  544 -20508 0
 20504  20505 -20506  544 -20509 0

c  0-1 --> -1
c    (-b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧ -p_544) -> ( b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0)
c  in CNF:
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨  b^{136, 5}_2
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_1
c     b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨  b^{136, 5}_0
c  in DIMACS:
 20504  20505  20506  544  20507 0
 20504  20505  20506  544 -20508 0
 20504  20505  20506  544  20509 0

c  -1-1 --> -2
c    ( b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧  b^{136, 4}_0 ∧ -p_544) -> ( b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0)
c  in CNF:
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨  b^{136, 5}_2
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨  b^{136, 5}_1
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨  p_544 ∨ -b^{136, 5}_0
c  in DIMACS:
-20504  20505 -20506  544  20507 0
-20504  20505 -20506  544  20508 0
-20504  20505 -20506  544 -20509 0

c  -2-1 --> break 
c    ( b^{136, 4}_2 ∧  b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨  b^{136, 4}_0 ∨  p_544 ∨ break
c  in DIMACS:
-20504 -20505  20506  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 4}_2 ∧ -b^{136, 4}_1 ∧ -b^{136, 4}_0 ∧ true) 
c  in CNF:
c    -b^{136, 4}_2 ∨  b^{136, 4}_1 ∨  b^{136, 4}_0 ∨ false 
c  in DIMACS:
-20504  20505  20506  0

c  3 does not represent an automaton state.
c    -(-b^{136, 4}_2 ∧  b^{136, 4}_1 ∧  b^{136, 4}_0 ∧ true) 
c  in CNF:
c     b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ false 
c  in DIMACS:
 20504 -20505 -20506  0
c  -3 does not represent an automaton state.
c    -( b^{136, 4}_2 ∧  b^{136, 4}_1 ∧  b^{136, 4}_0 ∧ true) 
c  in CNF:
c    -b^{136, 4}_2 ∨ -b^{136, 4}_1 ∨ -b^{136, 4}_0 ∨ false 
c  in DIMACS:
-20504 -20505 -20506  0

c i = 5
c  -2+1 --> -1
c    ( b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧  p_680) -> ( b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0)
c  in CNF:
c    -b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨  b^{136, 6}_2
c    -b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_1
c    -b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨  b^{136, 6}_0
c  in DIMACS:
-20507 -20508  20509 -680  20510 0
-20507 -20508  20509 -680 -20511 0
-20507 -20508  20509 -680  20512 0

c  -1+1 --> 0
c    ( b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0 ∧  p_680) -> (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧ -b^{136, 6}_0)
c  in CNF:
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_2
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_1
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_0
c  in DIMACS:
-20507  20508 -20509 -680 -20510 0
-20507  20508 -20509 -680 -20511 0
-20507  20508 -20509 -680 -20512 0

c  0+1 --> 1
c    (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧  p_680) -> (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0)
c  in CNF:
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_2
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_1
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨  b^{136, 6}_0
c  in DIMACS:
 20507  20508  20509 -680 -20510 0
 20507  20508  20509 -680 -20511 0
 20507  20508  20509 -680  20512 0

c  1+1 --> 2
c    (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0 ∧  p_680) -> (-b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0)
c  in CNF:
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_2
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨  b^{136, 6}_1
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ -p_680 ∨ -b^{136, 6}_0
c  in DIMACS:
 20507  20508 -20509 -680 -20510 0
 20507  20508 -20509 -680  20511 0
 20507  20508 -20509 -680 -20512 0

c  2+1 --> break 
c    (-b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧  p_680) -> break
c  in CNF:
c     b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 20507 -20508  20509 -680 1162 0


c  2-1 --> 1
c    (-b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧ -p_680) -> (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0)
c  in CNF:
c     b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_2
c     b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_1
c     b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨  b^{136, 6}_0
c  in DIMACS:
 20507 -20508  20509  680 -20510 0
 20507 -20508  20509  680 -20511 0
 20507 -20508  20509  680  20512 0

c  1-1 --> 0
c    (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0 ∧ -p_680) -> (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧ -b^{136, 6}_0)
c  in CNF:
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_2
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_1
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_0
c  in DIMACS:
 20507  20508 -20509  680 -20510 0
 20507  20508 -20509  680 -20511 0
 20507  20508 -20509  680 -20512 0

c  0-1 --> -1
c    (-b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧ -p_680) -> ( b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0)
c  in CNF:
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨  b^{136, 6}_2
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_1
c     b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨  b^{136, 6}_0
c  in DIMACS:
 20507  20508  20509  680  20510 0
 20507  20508  20509  680 -20511 0
 20507  20508  20509  680  20512 0

c  -1-1 --> -2
c    ( b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧  b^{136, 5}_0 ∧ -p_680) -> ( b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0)
c  in CNF:
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨  b^{136, 6}_2
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨  b^{136, 6}_1
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨  p_680 ∨ -b^{136, 6}_0
c  in DIMACS:
-20507  20508 -20509  680  20510 0
-20507  20508 -20509  680  20511 0
-20507  20508 -20509  680 -20512 0

c  -2-1 --> break 
c    ( b^{136, 5}_2 ∧  b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨  b^{136, 5}_0 ∨  p_680 ∨ break
c  in DIMACS:
-20507 -20508  20509  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 5}_2 ∧ -b^{136, 5}_1 ∧ -b^{136, 5}_0 ∧ true) 
c  in CNF:
c    -b^{136, 5}_2 ∨  b^{136, 5}_1 ∨  b^{136, 5}_0 ∨ false 
c  in DIMACS:
-20507  20508  20509  0

c  3 does not represent an automaton state.
c    -(-b^{136, 5}_2 ∧  b^{136, 5}_1 ∧  b^{136, 5}_0 ∧ true) 
c  in CNF:
c     b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ false 
c  in DIMACS:
 20507 -20508 -20509  0
c  -3 does not represent an automaton state.
c    -( b^{136, 5}_2 ∧  b^{136, 5}_1 ∧  b^{136, 5}_0 ∧ true) 
c  in CNF:
c    -b^{136, 5}_2 ∨ -b^{136, 5}_1 ∨ -b^{136, 5}_0 ∨ false 
c  in DIMACS:
-20507 -20508 -20509  0

c i = 6
c  -2+1 --> -1
c    ( b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧  p_816) -> ( b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0)
c  in CNF:
c    -b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨  b^{136, 7}_2
c    -b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_1
c    -b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨  b^{136, 7}_0
c  in DIMACS:
-20510 -20511  20512 -816  20513 0
-20510 -20511  20512 -816 -20514 0
-20510 -20511  20512 -816  20515 0

c  -1+1 --> 0
c    ( b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0 ∧  p_816) -> (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧ -b^{136, 7}_0)
c  in CNF:
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_2
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_1
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_0
c  in DIMACS:
-20510  20511 -20512 -816 -20513 0
-20510  20511 -20512 -816 -20514 0
-20510  20511 -20512 -816 -20515 0

c  0+1 --> 1
c    (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧  p_816) -> (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0)
c  in CNF:
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_2
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_1
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨  b^{136, 7}_0
c  in DIMACS:
 20510  20511  20512 -816 -20513 0
 20510  20511  20512 -816 -20514 0
 20510  20511  20512 -816  20515 0

c  1+1 --> 2
c    (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0 ∧  p_816) -> (-b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0)
c  in CNF:
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_2
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨  b^{136, 7}_1
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ -p_816 ∨ -b^{136, 7}_0
c  in DIMACS:
 20510  20511 -20512 -816 -20513 0
 20510  20511 -20512 -816  20514 0
 20510  20511 -20512 -816 -20515 0

c  2+1 --> break 
c    (-b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧  p_816) -> break
c  in CNF:
c     b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 20510 -20511  20512 -816 1162 0


c  2-1 --> 1
c    (-b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧ -p_816) -> (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0)
c  in CNF:
c     b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_2
c     b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_1
c     b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨  b^{136, 7}_0
c  in DIMACS:
 20510 -20511  20512  816 -20513 0
 20510 -20511  20512  816 -20514 0
 20510 -20511  20512  816  20515 0

c  1-1 --> 0
c    (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0 ∧ -p_816) -> (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧ -b^{136, 7}_0)
c  in CNF:
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_2
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_1
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_0
c  in DIMACS:
 20510  20511 -20512  816 -20513 0
 20510  20511 -20512  816 -20514 0
 20510  20511 -20512  816 -20515 0

c  0-1 --> -1
c    (-b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧ -p_816) -> ( b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0)
c  in CNF:
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨  b^{136, 7}_2
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_1
c     b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨  b^{136, 7}_0
c  in DIMACS:
 20510  20511  20512  816  20513 0
 20510  20511  20512  816 -20514 0
 20510  20511  20512  816  20515 0

c  -1-1 --> -2
c    ( b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧  b^{136, 6}_0 ∧ -p_816) -> ( b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0)
c  in CNF:
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨  b^{136, 7}_2
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨  b^{136, 7}_1
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨  p_816 ∨ -b^{136, 7}_0
c  in DIMACS:
-20510  20511 -20512  816  20513 0
-20510  20511 -20512  816  20514 0
-20510  20511 -20512  816 -20515 0

c  -2-1 --> break 
c    ( b^{136, 6}_2 ∧  b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨  b^{136, 6}_0 ∨  p_816 ∨ break
c  in DIMACS:
-20510 -20511  20512  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 6}_2 ∧ -b^{136, 6}_1 ∧ -b^{136, 6}_0 ∧ true) 
c  in CNF:
c    -b^{136, 6}_2 ∨  b^{136, 6}_1 ∨  b^{136, 6}_0 ∨ false 
c  in DIMACS:
-20510  20511  20512  0

c  3 does not represent an automaton state.
c    -(-b^{136, 6}_2 ∧  b^{136, 6}_1 ∧  b^{136, 6}_0 ∧ true) 
c  in CNF:
c     b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ false 
c  in DIMACS:
 20510 -20511 -20512  0
c  -3 does not represent an automaton state.
c    -( b^{136, 6}_2 ∧  b^{136, 6}_1 ∧  b^{136, 6}_0 ∧ true) 
c  in CNF:
c    -b^{136, 6}_2 ∨ -b^{136, 6}_1 ∨ -b^{136, 6}_0 ∨ false 
c  in DIMACS:
-20510 -20511 -20512  0

c i = 7
c  -2+1 --> -1
c    ( b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧  p_952) -> ( b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0)
c  in CNF:
c    -b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨  b^{136, 8}_2
c    -b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_1
c    -b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨  b^{136, 8}_0
c  in DIMACS:
-20513 -20514  20515 -952  20516 0
-20513 -20514  20515 -952 -20517 0
-20513 -20514  20515 -952  20518 0

c  -1+1 --> 0
c    ( b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0 ∧  p_952) -> (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧ -b^{136, 8}_0)
c  in CNF:
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_2
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_1
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_0
c  in DIMACS:
-20513  20514 -20515 -952 -20516 0
-20513  20514 -20515 -952 -20517 0
-20513  20514 -20515 -952 -20518 0

c  0+1 --> 1
c    (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧  p_952) -> (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0)
c  in CNF:
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_2
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_1
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨  b^{136, 8}_0
c  in DIMACS:
 20513  20514  20515 -952 -20516 0
 20513  20514  20515 -952 -20517 0
 20513  20514  20515 -952  20518 0

c  1+1 --> 2
c    (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0 ∧  p_952) -> (-b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0)
c  in CNF:
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_2
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨  b^{136, 8}_1
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ -p_952 ∨ -b^{136, 8}_0
c  in DIMACS:
 20513  20514 -20515 -952 -20516 0
 20513  20514 -20515 -952  20517 0
 20513  20514 -20515 -952 -20518 0

c  2+1 --> break 
c    (-b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧  p_952) -> break
c  in CNF:
c     b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 20513 -20514  20515 -952 1162 0


c  2-1 --> 1
c    (-b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧ -p_952) -> (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0)
c  in CNF:
c     b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_2
c     b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_1
c     b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨  b^{136, 8}_0
c  in DIMACS:
 20513 -20514  20515  952 -20516 0
 20513 -20514  20515  952 -20517 0
 20513 -20514  20515  952  20518 0

c  1-1 --> 0
c    (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0 ∧ -p_952) -> (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧ -b^{136, 8}_0)
c  in CNF:
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_2
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_1
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_0
c  in DIMACS:
 20513  20514 -20515  952 -20516 0
 20513  20514 -20515  952 -20517 0
 20513  20514 -20515  952 -20518 0

c  0-1 --> -1
c    (-b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧ -p_952) -> ( b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0)
c  in CNF:
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨  b^{136, 8}_2
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_1
c     b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨  b^{136, 8}_0
c  in DIMACS:
 20513  20514  20515  952  20516 0
 20513  20514  20515  952 -20517 0
 20513  20514  20515  952  20518 0

c  -1-1 --> -2
c    ( b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧  b^{136, 7}_0 ∧ -p_952) -> ( b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0)
c  in CNF:
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨  b^{136, 8}_2
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨  b^{136, 8}_1
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨  p_952 ∨ -b^{136, 8}_0
c  in DIMACS:
-20513  20514 -20515  952  20516 0
-20513  20514 -20515  952  20517 0
-20513  20514 -20515  952 -20518 0

c  -2-1 --> break 
c    ( b^{136, 7}_2 ∧  b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨  b^{136, 7}_0 ∨  p_952 ∨ break
c  in DIMACS:
-20513 -20514  20515  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 7}_2 ∧ -b^{136, 7}_1 ∧ -b^{136, 7}_0 ∧ true) 
c  in CNF:
c    -b^{136, 7}_2 ∨  b^{136, 7}_1 ∨  b^{136, 7}_0 ∨ false 
c  in DIMACS:
-20513  20514  20515  0

c  3 does not represent an automaton state.
c    -(-b^{136, 7}_2 ∧  b^{136, 7}_1 ∧  b^{136, 7}_0 ∧ true) 
c  in CNF:
c     b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ false 
c  in DIMACS:
 20513 -20514 -20515  0
c  -3 does not represent an automaton state.
c    -( b^{136, 7}_2 ∧  b^{136, 7}_1 ∧  b^{136, 7}_0 ∧ true) 
c  in CNF:
c    -b^{136, 7}_2 ∨ -b^{136, 7}_1 ∨ -b^{136, 7}_0 ∨ false 
c  in DIMACS:
-20513 -20514 -20515  0

c i = 8
c  -2+1 --> -1
c    ( b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧  p_1088) -> ( b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧  b^{136, 9}_0)
c  in CNF:
c    -b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨  b^{136, 9}_2
c    -b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_1
c    -b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨  b^{136, 9}_0
c  in DIMACS:
-20516 -20517  20518 -1088  20519 0
-20516 -20517  20518 -1088 -20520 0
-20516 -20517  20518 -1088  20521 0

c  -1+1 --> 0
c    ( b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0 ∧  p_1088) -> (-b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧ -b^{136, 9}_0)
c  in CNF:
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_2
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_1
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_0
c  in DIMACS:
-20516  20517 -20518 -1088 -20519 0
-20516  20517 -20518 -1088 -20520 0
-20516  20517 -20518 -1088 -20521 0

c  0+1 --> 1
c    (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧  p_1088) -> (-b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧  b^{136, 9}_0)
c  in CNF:
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_2
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_1
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨  b^{136, 9}_0
c  in DIMACS:
 20516  20517  20518 -1088 -20519 0
 20516  20517  20518 -1088 -20520 0
 20516  20517  20518 -1088  20521 0

c  1+1 --> 2
c    (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0 ∧  p_1088) -> (-b^{136, 9}_2 ∧  b^{136, 9}_1 ∧ -b^{136, 9}_0)
c  in CNF:
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_2
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨  b^{136, 9}_1
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ -p_1088 ∨ -b^{136, 9}_0
c  in DIMACS:
 20516  20517 -20518 -1088 -20519 0
 20516  20517 -20518 -1088  20520 0
 20516  20517 -20518 -1088 -20521 0

c  2+1 --> break 
c    (-b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 20516 -20517  20518 -1088 1162 0


c  2-1 --> 1
c    (-b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧ -p_1088) -> (-b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧  b^{136, 9}_0)
c  in CNF:
c     b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_2
c     b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_1
c     b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨  b^{136, 9}_0
c  in DIMACS:
 20516 -20517  20518  1088 -20519 0
 20516 -20517  20518  1088 -20520 0
 20516 -20517  20518  1088  20521 0

c  1-1 --> 0
c    (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0 ∧ -p_1088) -> (-b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧ -b^{136, 9}_0)
c  in CNF:
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_2
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_1
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_0
c  in DIMACS:
 20516  20517 -20518  1088 -20519 0
 20516  20517 -20518  1088 -20520 0
 20516  20517 -20518  1088 -20521 0

c  0-1 --> -1
c    (-b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧ -p_1088) -> ( b^{136, 9}_2 ∧ -b^{136, 9}_1 ∧  b^{136, 9}_0)
c  in CNF:
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨  b^{136, 9}_2
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_1
c     b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨  b^{136, 9}_0
c  in DIMACS:
 20516  20517  20518  1088  20519 0
 20516  20517  20518  1088 -20520 0
 20516  20517  20518  1088  20521 0

c  -1-1 --> -2
c    ( b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧  b^{136, 8}_0 ∧ -p_1088) -> ( b^{136, 9}_2 ∧  b^{136, 9}_1 ∧ -b^{136, 9}_0)
c  in CNF:
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨  b^{136, 9}_2
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨  b^{136, 9}_1
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨  p_1088 ∨ -b^{136, 9}_0
c  in DIMACS:
-20516  20517 -20518  1088  20519 0
-20516  20517 -20518  1088  20520 0
-20516  20517 -20518  1088 -20521 0

c  -2-1 --> break 
c    ( b^{136, 8}_2 ∧  b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨  b^{136, 8}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-20516 -20517  20518  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{136, 8}_2 ∧ -b^{136, 8}_1 ∧ -b^{136, 8}_0 ∧ true) 
c  in CNF:
c    -b^{136, 8}_2 ∨  b^{136, 8}_1 ∨  b^{136, 8}_0 ∨ false 
c  in DIMACS:
-20516  20517  20518  0

c  3 does not represent an automaton state.
c    -(-b^{136, 8}_2 ∧  b^{136, 8}_1 ∧  b^{136, 8}_0 ∧ true) 
c  in CNF:
c     b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ false 
c  in DIMACS:
 20516 -20517 -20518  0
c  -3 does not represent an automaton state.
c    -( b^{136, 8}_2 ∧  b^{136, 8}_1 ∧  b^{136, 8}_0 ∧ true) 
c  in CNF:
c    -b^{136, 8}_2 ∨ -b^{136, 8}_1 ∨ -b^{136, 8}_0 ∨ false 
c  in DIMACS:
-20516 -20517 -20518  0

c INIT for k = 137
c    -b^{137, 1}_2
c    -b^{137, 1}_1
c    -b^{137, 1}_0
c  in DIMACS:
-20522 0
-20523 0
-20524 0

c Transitions for k = 137
c i = 1
c  -2+1 --> -1
c    ( b^{137, 1}_2 ∧  b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧  p_137) -> ( b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0)
c  in CNF:
c    -b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨  b^{137, 2}_2
c    -b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_1
c    -b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨  b^{137, 2}_0
c  in DIMACS:
-20522 -20523  20524 -137  20525 0
-20522 -20523  20524 -137 -20526 0
-20522 -20523  20524 -137  20527 0

c  -1+1 --> 0
c    ( b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧  b^{137, 1}_0 ∧  p_137) -> (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧ -b^{137, 2}_0)
c  in CNF:
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_2
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_1
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_0
c  in DIMACS:
-20522  20523 -20524 -137 -20525 0
-20522  20523 -20524 -137 -20526 0
-20522  20523 -20524 -137 -20527 0

c  0+1 --> 1
c    (-b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧  p_137) -> (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0)
c  in CNF:
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_2
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_1
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨  b^{137, 2}_0
c  in DIMACS:
 20522  20523  20524 -137 -20525 0
 20522  20523  20524 -137 -20526 0
 20522  20523  20524 -137  20527 0

c  1+1 --> 2
c    (-b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧  b^{137, 1}_0 ∧  p_137) -> (-b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0)
c  in CNF:
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_2
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨  b^{137, 2}_1
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ -p_137 ∨ -b^{137, 2}_0
c  in DIMACS:
 20522  20523 -20524 -137 -20525 0
 20522  20523 -20524 -137  20526 0
 20522  20523 -20524 -137 -20527 0

c  2+1 --> break 
c    (-b^{137, 1}_2 ∧  b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧  p_137) -> break
c  in CNF:
c     b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ -p_137 ∨ break
c  in DIMACS:
 20522 -20523  20524 -137 1162 0


c  2-1 --> 1
c    (-b^{137, 1}_2 ∧  b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧ -p_137) -> (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0)
c  in CNF:
c     b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_2
c     b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_1
c     b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨  b^{137, 2}_0
c  in DIMACS:
 20522 -20523  20524  137 -20525 0
 20522 -20523  20524  137 -20526 0
 20522 -20523  20524  137  20527 0

c  1-1 --> 0
c    (-b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧  b^{137, 1}_0 ∧ -p_137) -> (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧ -b^{137, 2}_0)
c  in CNF:
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_2
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_1
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_0
c  in DIMACS:
 20522  20523 -20524  137 -20525 0
 20522  20523 -20524  137 -20526 0
 20522  20523 -20524  137 -20527 0

c  0-1 --> -1
c    (-b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧ -p_137) -> ( b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0)
c  in CNF:
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨  b^{137, 2}_2
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_1
c     b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨  b^{137, 2}_0
c  in DIMACS:
 20522  20523  20524  137  20525 0
 20522  20523  20524  137 -20526 0
 20522  20523  20524  137  20527 0

c  -1-1 --> -2
c    ( b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧  b^{137, 1}_0 ∧ -p_137) -> ( b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0)
c  in CNF:
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨  b^{137, 2}_2
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨  b^{137, 2}_1
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨  p_137 ∨ -b^{137, 2}_0
c  in DIMACS:
-20522  20523 -20524  137  20525 0
-20522  20523 -20524  137  20526 0
-20522  20523 -20524  137 -20527 0

c  -2-1 --> break 
c    ( b^{137, 1}_2 ∧  b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧ -p_137) -> break
c  in CNF:
c    -b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨  b^{137, 1}_0 ∨  p_137 ∨ break
c  in DIMACS:
-20522 -20523  20524  137 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 1}_2 ∧ -b^{137, 1}_1 ∧ -b^{137, 1}_0 ∧ true) 
c  in CNF:
c    -b^{137, 1}_2 ∨  b^{137, 1}_1 ∨  b^{137, 1}_0 ∨ false 
c  in DIMACS:
-20522  20523  20524  0

c  3 does not represent an automaton state.
c    -(-b^{137, 1}_2 ∧  b^{137, 1}_1 ∧  b^{137, 1}_0 ∧ true) 
c  in CNF:
c     b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ false 
c  in DIMACS:
 20522 -20523 -20524  0
c  -3 does not represent an automaton state.
c    -( b^{137, 1}_2 ∧  b^{137, 1}_1 ∧  b^{137, 1}_0 ∧ true) 
c  in CNF:
c    -b^{137, 1}_2 ∨ -b^{137, 1}_1 ∨ -b^{137, 1}_0 ∨ false 
c  in DIMACS:
-20522 -20523 -20524  0

c i = 2
c  -2+1 --> -1
c    ( b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧  p_274) -> ( b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0)
c  in CNF:
c    -b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨  b^{137, 3}_2
c    -b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_1
c    -b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨  b^{137, 3}_0
c  in DIMACS:
-20525 -20526  20527 -274  20528 0
-20525 -20526  20527 -274 -20529 0
-20525 -20526  20527 -274  20530 0

c  -1+1 --> 0
c    ( b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0 ∧  p_274) -> (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧ -b^{137, 3}_0)
c  in CNF:
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_2
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_1
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_0
c  in DIMACS:
-20525  20526 -20527 -274 -20528 0
-20525  20526 -20527 -274 -20529 0
-20525  20526 -20527 -274 -20530 0

c  0+1 --> 1
c    (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧  p_274) -> (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0)
c  in CNF:
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_2
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_1
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨  b^{137, 3}_0
c  in DIMACS:
 20525  20526  20527 -274 -20528 0
 20525  20526  20527 -274 -20529 0
 20525  20526  20527 -274  20530 0

c  1+1 --> 2
c    (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0 ∧  p_274) -> (-b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0)
c  in CNF:
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_2
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨  b^{137, 3}_1
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ -p_274 ∨ -b^{137, 3}_0
c  in DIMACS:
 20525  20526 -20527 -274 -20528 0
 20525  20526 -20527 -274  20529 0
 20525  20526 -20527 -274 -20530 0

c  2+1 --> break 
c    (-b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧  p_274) -> break
c  in CNF:
c     b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ -p_274 ∨ break
c  in DIMACS:
 20525 -20526  20527 -274 1162 0


c  2-1 --> 1
c    (-b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧ -p_274) -> (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0)
c  in CNF:
c     b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_2
c     b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_1
c     b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨  b^{137, 3}_0
c  in DIMACS:
 20525 -20526  20527  274 -20528 0
 20525 -20526  20527  274 -20529 0
 20525 -20526  20527  274  20530 0

c  1-1 --> 0
c    (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0 ∧ -p_274) -> (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧ -b^{137, 3}_0)
c  in CNF:
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_2
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_1
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_0
c  in DIMACS:
 20525  20526 -20527  274 -20528 0
 20525  20526 -20527  274 -20529 0
 20525  20526 -20527  274 -20530 0

c  0-1 --> -1
c    (-b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧ -p_274) -> ( b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0)
c  in CNF:
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨  b^{137, 3}_2
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_1
c     b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨  b^{137, 3}_0
c  in DIMACS:
 20525  20526  20527  274  20528 0
 20525  20526  20527  274 -20529 0
 20525  20526  20527  274  20530 0

c  -1-1 --> -2
c    ( b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧  b^{137, 2}_0 ∧ -p_274) -> ( b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0)
c  in CNF:
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨  b^{137, 3}_2
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨  b^{137, 3}_1
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨  p_274 ∨ -b^{137, 3}_0
c  in DIMACS:
-20525  20526 -20527  274  20528 0
-20525  20526 -20527  274  20529 0
-20525  20526 -20527  274 -20530 0

c  -2-1 --> break 
c    ( b^{137, 2}_2 ∧  b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧ -p_274) -> break
c  in CNF:
c    -b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨  b^{137, 2}_0 ∨  p_274 ∨ break
c  in DIMACS:
-20525 -20526  20527  274 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 2}_2 ∧ -b^{137, 2}_1 ∧ -b^{137, 2}_0 ∧ true) 
c  in CNF:
c    -b^{137, 2}_2 ∨  b^{137, 2}_1 ∨  b^{137, 2}_0 ∨ false 
c  in DIMACS:
-20525  20526  20527  0

c  3 does not represent an automaton state.
c    -(-b^{137, 2}_2 ∧  b^{137, 2}_1 ∧  b^{137, 2}_0 ∧ true) 
c  in CNF:
c     b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ false 
c  in DIMACS:
 20525 -20526 -20527  0
c  -3 does not represent an automaton state.
c    -( b^{137, 2}_2 ∧  b^{137, 2}_1 ∧  b^{137, 2}_0 ∧ true) 
c  in CNF:
c    -b^{137, 2}_2 ∨ -b^{137, 2}_1 ∨ -b^{137, 2}_0 ∨ false 
c  in DIMACS:
-20525 -20526 -20527  0

c i = 3
c  -2+1 --> -1
c    ( b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧  p_411) -> ( b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0)
c  in CNF:
c    -b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨  b^{137, 4}_2
c    -b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_1
c    -b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨  b^{137, 4}_0
c  in DIMACS:
-20528 -20529  20530 -411  20531 0
-20528 -20529  20530 -411 -20532 0
-20528 -20529  20530 -411  20533 0

c  -1+1 --> 0
c    ( b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0 ∧  p_411) -> (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧ -b^{137, 4}_0)
c  in CNF:
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_2
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_1
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_0
c  in DIMACS:
-20528  20529 -20530 -411 -20531 0
-20528  20529 -20530 -411 -20532 0
-20528  20529 -20530 -411 -20533 0

c  0+1 --> 1
c    (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧  p_411) -> (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0)
c  in CNF:
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_2
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_1
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨  b^{137, 4}_0
c  in DIMACS:
 20528  20529  20530 -411 -20531 0
 20528  20529  20530 -411 -20532 0
 20528  20529  20530 -411  20533 0

c  1+1 --> 2
c    (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0 ∧  p_411) -> (-b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0)
c  in CNF:
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_2
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨  b^{137, 4}_1
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ -p_411 ∨ -b^{137, 4}_0
c  in DIMACS:
 20528  20529 -20530 -411 -20531 0
 20528  20529 -20530 -411  20532 0
 20528  20529 -20530 -411 -20533 0

c  2+1 --> break 
c    (-b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧  p_411) -> break
c  in CNF:
c     b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ -p_411 ∨ break
c  in DIMACS:
 20528 -20529  20530 -411 1162 0


c  2-1 --> 1
c    (-b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧ -p_411) -> (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0)
c  in CNF:
c     b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_2
c     b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_1
c     b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨  b^{137, 4}_0
c  in DIMACS:
 20528 -20529  20530  411 -20531 0
 20528 -20529  20530  411 -20532 0
 20528 -20529  20530  411  20533 0

c  1-1 --> 0
c    (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0 ∧ -p_411) -> (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧ -b^{137, 4}_0)
c  in CNF:
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_2
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_1
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_0
c  in DIMACS:
 20528  20529 -20530  411 -20531 0
 20528  20529 -20530  411 -20532 0
 20528  20529 -20530  411 -20533 0

c  0-1 --> -1
c    (-b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧ -p_411) -> ( b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0)
c  in CNF:
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨  b^{137, 4}_2
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_1
c     b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨  b^{137, 4}_0
c  in DIMACS:
 20528  20529  20530  411  20531 0
 20528  20529  20530  411 -20532 0
 20528  20529  20530  411  20533 0

c  -1-1 --> -2
c    ( b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧  b^{137, 3}_0 ∧ -p_411) -> ( b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0)
c  in CNF:
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨  b^{137, 4}_2
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨  b^{137, 4}_1
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨  p_411 ∨ -b^{137, 4}_0
c  in DIMACS:
-20528  20529 -20530  411  20531 0
-20528  20529 -20530  411  20532 0
-20528  20529 -20530  411 -20533 0

c  -2-1 --> break 
c    ( b^{137, 3}_2 ∧  b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧ -p_411) -> break
c  in CNF:
c    -b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨  b^{137, 3}_0 ∨  p_411 ∨ break
c  in DIMACS:
-20528 -20529  20530  411 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 3}_2 ∧ -b^{137, 3}_1 ∧ -b^{137, 3}_0 ∧ true) 
c  in CNF:
c    -b^{137, 3}_2 ∨  b^{137, 3}_1 ∨  b^{137, 3}_0 ∨ false 
c  in DIMACS:
-20528  20529  20530  0

c  3 does not represent an automaton state.
c    -(-b^{137, 3}_2 ∧  b^{137, 3}_1 ∧  b^{137, 3}_0 ∧ true) 
c  in CNF:
c     b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ false 
c  in DIMACS:
 20528 -20529 -20530  0
c  -3 does not represent an automaton state.
c    -( b^{137, 3}_2 ∧  b^{137, 3}_1 ∧  b^{137, 3}_0 ∧ true) 
c  in CNF:
c    -b^{137, 3}_2 ∨ -b^{137, 3}_1 ∨ -b^{137, 3}_0 ∨ false 
c  in DIMACS:
-20528 -20529 -20530  0

c i = 4
c  -2+1 --> -1
c    ( b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧  p_548) -> ( b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0)
c  in CNF:
c    -b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨  b^{137, 5}_2
c    -b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_1
c    -b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨  b^{137, 5}_0
c  in DIMACS:
-20531 -20532  20533 -548  20534 0
-20531 -20532  20533 -548 -20535 0
-20531 -20532  20533 -548  20536 0

c  -1+1 --> 0
c    ( b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0 ∧  p_548) -> (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧ -b^{137, 5}_0)
c  in CNF:
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_2
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_1
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_0
c  in DIMACS:
-20531  20532 -20533 -548 -20534 0
-20531  20532 -20533 -548 -20535 0
-20531  20532 -20533 -548 -20536 0

c  0+1 --> 1
c    (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧  p_548) -> (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0)
c  in CNF:
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_2
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_1
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨  b^{137, 5}_0
c  in DIMACS:
 20531  20532  20533 -548 -20534 0
 20531  20532  20533 -548 -20535 0
 20531  20532  20533 -548  20536 0

c  1+1 --> 2
c    (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0 ∧  p_548) -> (-b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0)
c  in CNF:
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_2
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨  b^{137, 5}_1
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ -p_548 ∨ -b^{137, 5}_0
c  in DIMACS:
 20531  20532 -20533 -548 -20534 0
 20531  20532 -20533 -548  20535 0
 20531  20532 -20533 -548 -20536 0

c  2+1 --> break 
c    (-b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧  p_548) -> break
c  in CNF:
c     b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ -p_548 ∨ break
c  in DIMACS:
 20531 -20532  20533 -548 1162 0


c  2-1 --> 1
c    (-b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧ -p_548) -> (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0)
c  in CNF:
c     b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_2
c     b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_1
c     b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨  b^{137, 5}_0
c  in DIMACS:
 20531 -20532  20533  548 -20534 0
 20531 -20532  20533  548 -20535 0
 20531 -20532  20533  548  20536 0

c  1-1 --> 0
c    (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0 ∧ -p_548) -> (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧ -b^{137, 5}_0)
c  in CNF:
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_2
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_1
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_0
c  in DIMACS:
 20531  20532 -20533  548 -20534 0
 20531  20532 -20533  548 -20535 0
 20531  20532 -20533  548 -20536 0

c  0-1 --> -1
c    (-b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧ -p_548) -> ( b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0)
c  in CNF:
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨  b^{137, 5}_2
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_1
c     b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨  b^{137, 5}_0
c  in DIMACS:
 20531  20532  20533  548  20534 0
 20531  20532  20533  548 -20535 0
 20531  20532  20533  548  20536 0

c  -1-1 --> -2
c    ( b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧  b^{137, 4}_0 ∧ -p_548) -> ( b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0)
c  in CNF:
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨  b^{137, 5}_2
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨  b^{137, 5}_1
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨  p_548 ∨ -b^{137, 5}_0
c  in DIMACS:
-20531  20532 -20533  548  20534 0
-20531  20532 -20533  548  20535 0
-20531  20532 -20533  548 -20536 0

c  -2-1 --> break 
c    ( b^{137, 4}_2 ∧  b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧ -p_548) -> break
c  in CNF:
c    -b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨  b^{137, 4}_0 ∨  p_548 ∨ break
c  in DIMACS:
-20531 -20532  20533  548 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 4}_2 ∧ -b^{137, 4}_1 ∧ -b^{137, 4}_0 ∧ true) 
c  in CNF:
c    -b^{137, 4}_2 ∨  b^{137, 4}_1 ∨  b^{137, 4}_0 ∨ false 
c  in DIMACS:
-20531  20532  20533  0

c  3 does not represent an automaton state.
c    -(-b^{137, 4}_2 ∧  b^{137, 4}_1 ∧  b^{137, 4}_0 ∧ true) 
c  in CNF:
c     b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ false 
c  in DIMACS:
 20531 -20532 -20533  0
c  -3 does not represent an automaton state.
c    -( b^{137, 4}_2 ∧  b^{137, 4}_1 ∧  b^{137, 4}_0 ∧ true) 
c  in CNF:
c    -b^{137, 4}_2 ∨ -b^{137, 4}_1 ∨ -b^{137, 4}_0 ∨ false 
c  in DIMACS:
-20531 -20532 -20533  0

c i = 5
c  -2+1 --> -1
c    ( b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧  p_685) -> ( b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0)
c  in CNF:
c    -b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨  b^{137, 6}_2
c    -b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_1
c    -b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨  b^{137, 6}_0
c  in DIMACS:
-20534 -20535  20536 -685  20537 0
-20534 -20535  20536 -685 -20538 0
-20534 -20535  20536 -685  20539 0

c  -1+1 --> 0
c    ( b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0 ∧  p_685) -> (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧ -b^{137, 6}_0)
c  in CNF:
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_2
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_1
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_0
c  in DIMACS:
-20534  20535 -20536 -685 -20537 0
-20534  20535 -20536 -685 -20538 0
-20534  20535 -20536 -685 -20539 0

c  0+1 --> 1
c    (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧  p_685) -> (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0)
c  in CNF:
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_2
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_1
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨  b^{137, 6}_0
c  in DIMACS:
 20534  20535  20536 -685 -20537 0
 20534  20535  20536 -685 -20538 0
 20534  20535  20536 -685  20539 0

c  1+1 --> 2
c    (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0 ∧  p_685) -> (-b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0)
c  in CNF:
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_2
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨  b^{137, 6}_1
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ -p_685 ∨ -b^{137, 6}_0
c  in DIMACS:
 20534  20535 -20536 -685 -20537 0
 20534  20535 -20536 -685  20538 0
 20534  20535 -20536 -685 -20539 0

c  2+1 --> break 
c    (-b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧  p_685) -> break
c  in CNF:
c     b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ -p_685 ∨ break
c  in DIMACS:
 20534 -20535  20536 -685 1162 0


c  2-1 --> 1
c    (-b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧ -p_685) -> (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0)
c  in CNF:
c     b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_2
c     b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_1
c     b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨  b^{137, 6}_0
c  in DIMACS:
 20534 -20535  20536  685 -20537 0
 20534 -20535  20536  685 -20538 0
 20534 -20535  20536  685  20539 0

c  1-1 --> 0
c    (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0 ∧ -p_685) -> (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧ -b^{137, 6}_0)
c  in CNF:
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_2
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_1
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_0
c  in DIMACS:
 20534  20535 -20536  685 -20537 0
 20534  20535 -20536  685 -20538 0
 20534  20535 -20536  685 -20539 0

c  0-1 --> -1
c    (-b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧ -p_685) -> ( b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0)
c  in CNF:
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨  b^{137, 6}_2
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_1
c     b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨  b^{137, 6}_0
c  in DIMACS:
 20534  20535  20536  685  20537 0
 20534  20535  20536  685 -20538 0
 20534  20535  20536  685  20539 0

c  -1-1 --> -2
c    ( b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧  b^{137, 5}_0 ∧ -p_685) -> ( b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0)
c  in CNF:
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨  b^{137, 6}_2
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨  b^{137, 6}_1
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨  p_685 ∨ -b^{137, 6}_0
c  in DIMACS:
-20534  20535 -20536  685  20537 0
-20534  20535 -20536  685  20538 0
-20534  20535 -20536  685 -20539 0

c  -2-1 --> break 
c    ( b^{137, 5}_2 ∧  b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧ -p_685) -> break
c  in CNF:
c    -b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨  b^{137, 5}_0 ∨  p_685 ∨ break
c  in DIMACS:
-20534 -20535  20536  685 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 5}_2 ∧ -b^{137, 5}_1 ∧ -b^{137, 5}_0 ∧ true) 
c  in CNF:
c    -b^{137, 5}_2 ∨  b^{137, 5}_1 ∨  b^{137, 5}_0 ∨ false 
c  in DIMACS:
-20534  20535  20536  0

c  3 does not represent an automaton state.
c    -(-b^{137, 5}_2 ∧  b^{137, 5}_1 ∧  b^{137, 5}_0 ∧ true) 
c  in CNF:
c     b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ false 
c  in DIMACS:
 20534 -20535 -20536  0
c  -3 does not represent an automaton state.
c    -( b^{137, 5}_2 ∧  b^{137, 5}_1 ∧  b^{137, 5}_0 ∧ true) 
c  in CNF:
c    -b^{137, 5}_2 ∨ -b^{137, 5}_1 ∨ -b^{137, 5}_0 ∨ false 
c  in DIMACS:
-20534 -20535 -20536  0

c i = 6
c  -2+1 --> -1
c    ( b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧  p_822) -> ( b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0)
c  in CNF:
c    -b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨  b^{137, 7}_2
c    -b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_1
c    -b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨  b^{137, 7}_0
c  in DIMACS:
-20537 -20538  20539 -822  20540 0
-20537 -20538  20539 -822 -20541 0
-20537 -20538  20539 -822  20542 0

c  -1+1 --> 0
c    ( b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0 ∧  p_822) -> (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧ -b^{137, 7}_0)
c  in CNF:
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_2
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_1
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_0
c  in DIMACS:
-20537  20538 -20539 -822 -20540 0
-20537  20538 -20539 -822 -20541 0
-20537  20538 -20539 -822 -20542 0

c  0+1 --> 1
c    (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧  p_822) -> (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0)
c  in CNF:
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_2
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_1
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨  b^{137, 7}_0
c  in DIMACS:
 20537  20538  20539 -822 -20540 0
 20537  20538  20539 -822 -20541 0
 20537  20538  20539 -822  20542 0

c  1+1 --> 2
c    (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0 ∧  p_822) -> (-b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0)
c  in CNF:
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_2
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨  b^{137, 7}_1
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ -p_822 ∨ -b^{137, 7}_0
c  in DIMACS:
 20537  20538 -20539 -822 -20540 0
 20537  20538 -20539 -822  20541 0
 20537  20538 -20539 -822 -20542 0

c  2+1 --> break 
c    (-b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧  p_822) -> break
c  in CNF:
c     b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 20537 -20538  20539 -822 1162 0


c  2-1 --> 1
c    (-b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧ -p_822) -> (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0)
c  in CNF:
c     b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_2
c     b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_1
c     b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨  b^{137, 7}_0
c  in DIMACS:
 20537 -20538  20539  822 -20540 0
 20537 -20538  20539  822 -20541 0
 20537 -20538  20539  822  20542 0

c  1-1 --> 0
c    (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0 ∧ -p_822) -> (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧ -b^{137, 7}_0)
c  in CNF:
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_2
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_1
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_0
c  in DIMACS:
 20537  20538 -20539  822 -20540 0
 20537  20538 -20539  822 -20541 0
 20537  20538 -20539  822 -20542 0

c  0-1 --> -1
c    (-b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧ -p_822) -> ( b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0)
c  in CNF:
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨  b^{137, 7}_2
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_1
c     b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨  b^{137, 7}_0
c  in DIMACS:
 20537  20538  20539  822  20540 0
 20537  20538  20539  822 -20541 0
 20537  20538  20539  822  20542 0

c  -1-1 --> -2
c    ( b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧  b^{137, 6}_0 ∧ -p_822) -> ( b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0)
c  in CNF:
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨  b^{137, 7}_2
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨  b^{137, 7}_1
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨  p_822 ∨ -b^{137, 7}_0
c  in DIMACS:
-20537  20538 -20539  822  20540 0
-20537  20538 -20539  822  20541 0
-20537  20538 -20539  822 -20542 0

c  -2-1 --> break 
c    ( b^{137, 6}_2 ∧  b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨  b^{137, 6}_0 ∨  p_822 ∨ break
c  in DIMACS:
-20537 -20538  20539  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 6}_2 ∧ -b^{137, 6}_1 ∧ -b^{137, 6}_0 ∧ true) 
c  in CNF:
c    -b^{137, 6}_2 ∨  b^{137, 6}_1 ∨  b^{137, 6}_0 ∨ false 
c  in DIMACS:
-20537  20538  20539  0

c  3 does not represent an automaton state.
c    -(-b^{137, 6}_2 ∧  b^{137, 6}_1 ∧  b^{137, 6}_0 ∧ true) 
c  in CNF:
c     b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ false 
c  in DIMACS:
 20537 -20538 -20539  0
c  -3 does not represent an automaton state.
c    -( b^{137, 6}_2 ∧  b^{137, 6}_1 ∧  b^{137, 6}_0 ∧ true) 
c  in CNF:
c    -b^{137, 6}_2 ∨ -b^{137, 6}_1 ∨ -b^{137, 6}_0 ∨ false 
c  in DIMACS:
-20537 -20538 -20539  0

c i = 7
c  -2+1 --> -1
c    ( b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧  p_959) -> ( b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0)
c  in CNF:
c    -b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨  b^{137, 8}_2
c    -b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_1
c    -b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨  b^{137, 8}_0
c  in DIMACS:
-20540 -20541  20542 -959  20543 0
-20540 -20541  20542 -959 -20544 0
-20540 -20541  20542 -959  20545 0

c  -1+1 --> 0
c    ( b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0 ∧  p_959) -> (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧ -b^{137, 8}_0)
c  in CNF:
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_2
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_1
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_0
c  in DIMACS:
-20540  20541 -20542 -959 -20543 0
-20540  20541 -20542 -959 -20544 0
-20540  20541 -20542 -959 -20545 0

c  0+1 --> 1
c    (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧  p_959) -> (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0)
c  in CNF:
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_2
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_1
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨  b^{137, 8}_0
c  in DIMACS:
 20540  20541  20542 -959 -20543 0
 20540  20541  20542 -959 -20544 0
 20540  20541  20542 -959  20545 0

c  1+1 --> 2
c    (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0 ∧  p_959) -> (-b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0)
c  in CNF:
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_2
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨  b^{137, 8}_1
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ -p_959 ∨ -b^{137, 8}_0
c  in DIMACS:
 20540  20541 -20542 -959 -20543 0
 20540  20541 -20542 -959  20544 0
 20540  20541 -20542 -959 -20545 0

c  2+1 --> break 
c    (-b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧  p_959) -> break
c  in CNF:
c     b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ -p_959 ∨ break
c  in DIMACS:
 20540 -20541  20542 -959 1162 0


c  2-1 --> 1
c    (-b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧ -p_959) -> (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0)
c  in CNF:
c     b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_2
c     b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_1
c     b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨  b^{137, 8}_0
c  in DIMACS:
 20540 -20541  20542  959 -20543 0
 20540 -20541  20542  959 -20544 0
 20540 -20541  20542  959  20545 0

c  1-1 --> 0
c    (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0 ∧ -p_959) -> (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧ -b^{137, 8}_0)
c  in CNF:
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_2
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_1
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_0
c  in DIMACS:
 20540  20541 -20542  959 -20543 0
 20540  20541 -20542  959 -20544 0
 20540  20541 -20542  959 -20545 0

c  0-1 --> -1
c    (-b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧ -p_959) -> ( b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0)
c  in CNF:
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨  b^{137, 8}_2
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_1
c     b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨  b^{137, 8}_0
c  in DIMACS:
 20540  20541  20542  959  20543 0
 20540  20541  20542  959 -20544 0
 20540  20541  20542  959  20545 0

c  -1-1 --> -2
c    ( b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧  b^{137, 7}_0 ∧ -p_959) -> ( b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0)
c  in CNF:
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨  b^{137, 8}_2
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨  b^{137, 8}_1
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨  p_959 ∨ -b^{137, 8}_0
c  in DIMACS:
-20540  20541 -20542  959  20543 0
-20540  20541 -20542  959  20544 0
-20540  20541 -20542  959 -20545 0

c  -2-1 --> break 
c    ( b^{137, 7}_2 ∧  b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧ -p_959) -> break
c  in CNF:
c    -b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨  b^{137, 7}_0 ∨  p_959 ∨ break
c  in DIMACS:
-20540 -20541  20542  959 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 7}_2 ∧ -b^{137, 7}_1 ∧ -b^{137, 7}_0 ∧ true) 
c  in CNF:
c    -b^{137, 7}_2 ∨  b^{137, 7}_1 ∨  b^{137, 7}_0 ∨ false 
c  in DIMACS:
-20540  20541  20542  0

c  3 does not represent an automaton state.
c    -(-b^{137, 7}_2 ∧  b^{137, 7}_1 ∧  b^{137, 7}_0 ∧ true) 
c  in CNF:
c     b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ false 
c  in DIMACS:
 20540 -20541 -20542  0
c  -3 does not represent an automaton state.
c    -( b^{137, 7}_2 ∧  b^{137, 7}_1 ∧  b^{137, 7}_0 ∧ true) 
c  in CNF:
c    -b^{137, 7}_2 ∨ -b^{137, 7}_1 ∨ -b^{137, 7}_0 ∨ false 
c  in DIMACS:
-20540 -20541 -20542  0

c i = 8
c  -2+1 --> -1
c    ( b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧  p_1096) -> ( b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧  b^{137, 9}_0)
c  in CNF:
c    -b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨  b^{137, 9}_2
c    -b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_1
c    -b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨  b^{137, 9}_0
c  in DIMACS:
-20543 -20544  20545 -1096  20546 0
-20543 -20544  20545 -1096 -20547 0
-20543 -20544  20545 -1096  20548 0

c  -1+1 --> 0
c    ( b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0 ∧  p_1096) -> (-b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧ -b^{137, 9}_0)
c  in CNF:
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_2
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_1
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_0
c  in DIMACS:
-20543  20544 -20545 -1096 -20546 0
-20543  20544 -20545 -1096 -20547 0
-20543  20544 -20545 -1096 -20548 0

c  0+1 --> 1
c    (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧  p_1096) -> (-b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧  b^{137, 9}_0)
c  in CNF:
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_2
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_1
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨  b^{137, 9}_0
c  in DIMACS:
 20543  20544  20545 -1096 -20546 0
 20543  20544  20545 -1096 -20547 0
 20543  20544  20545 -1096  20548 0

c  1+1 --> 2
c    (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0 ∧  p_1096) -> (-b^{137, 9}_2 ∧  b^{137, 9}_1 ∧ -b^{137, 9}_0)
c  in CNF:
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_2
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨  b^{137, 9}_1
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ -p_1096 ∨ -b^{137, 9}_0
c  in DIMACS:
 20543  20544 -20545 -1096 -20546 0
 20543  20544 -20545 -1096  20547 0
 20543  20544 -20545 -1096 -20548 0

c  2+1 --> break 
c    (-b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 20543 -20544  20545 -1096 1162 0


c  2-1 --> 1
c    (-b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧ -p_1096) -> (-b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧  b^{137, 9}_0)
c  in CNF:
c     b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_2
c     b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_1
c     b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨  b^{137, 9}_0
c  in DIMACS:
 20543 -20544  20545  1096 -20546 0
 20543 -20544  20545  1096 -20547 0
 20543 -20544  20545  1096  20548 0

c  1-1 --> 0
c    (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0 ∧ -p_1096) -> (-b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧ -b^{137, 9}_0)
c  in CNF:
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_2
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_1
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_0
c  in DIMACS:
 20543  20544 -20545  1096 -20546 0
 20543  20544 -20545  1096 -20547 0
 20543  20544 -20545  1096 -20548 0

c  0-1 --> -1
c    (-b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧ -p_1096) -> ( b^{137, 9}_2 ∧ -b^{137, 9}_1 ∧  b^{137, 9}_0)
c  in CNF:
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨  b^{137, 9}_2
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_1
c     b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨  b^{137, 9}_0
c  in DIMACS:
 20543  20544  20545  1096  20546 0
 20543  20544  20545  1096 -20547 0
 20543  20544  20545  1096  20548 0

c  -1-1 --> -2
c    ( b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧  b^{137, 8}_0 ∧ -p_1096) -> ( b^{137, 9}_2 ∧  b^{137, 9}_1 ∧ -b^{137, 9}_0)
c  in CNF:
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨  b^{137, 9}_2
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨  b^{137, 9}_1
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨  p_1096 ∨ -b^{137, 9}_0
c  in DIMACS:
-20543  20544 -20545  1096  20546 0
-20543  20544 -20545  1096  20547 0
-20543  20544 -20545  1096 -20548 0

c  -2-1 --> break 
c    ( b^{137, 8}_2 ∧  b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨  b^{137, 8}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-20543 -20544  20545  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{137, 8}_2 ∧ -b^{137, 8}_1 ∧ -b^{137, 8}_0 ∧ true) 
c  in CNF:
c    -b^{137, 8}_2 ∨  b^{137, 8}_1 ∨  b^{137, 8}_0 ∨ false 
c  in DIMACS:
-20543  20544  20545  0

c  3 does not represent an automaton state.
c    -(-b^{137, 8}_2 ∧  b^{137, 8}_1 ∧  b^{137, 8}_0 ∧ true) 
c  in CNF:
c     b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ false 
c  in DIMACS:
 20543 -20544 -20545  0
c  -3 does not represent an automaton state.
c    -( b^{137, 8}_2 ∧  b^{137, 8}_1 ∧  b^{137, 8}_0 ∧ true) 
c  in CNF:
c    -b^{137, 8}_2 ∨ -b^{137, 8}_1 ∨ -b^{137, 8}_0 ∨ false 
c  in DIMACS:
-20543 -20544 -20545  0

c INIT for k = 138
c    -b^{138, 1}_2
c    -b^{138, 1}_1
c    -b^{138, 1}_0
c  in DIMACS:
-20549 0
-20550 0
-20551 0

c Transitions for k = 138
c i = 1
c  -2+1 --> -1
c    ( b^{138, 1}_2 ∧  b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧  p_138) -> ( b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0)
c  in CNF:
c    -b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨  b^{138, 2}_2
c    -b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_1
c    -b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨  b^{138, 2}_0
c  in DIMACS:
-20549 -20550  20551 -138  20552 0
-20549 -20550  20551 -138 -20553 0
-20549 -20550  20551 -138  20554 0

c  -1+1 --> 0
c    ( b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧  b^{138, 1}_0 ∧  p_138) -> (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧ -b^{138, 2}_0)
c  in CNF:
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_2
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_1
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_0
c  in DIMACS:
-20549  20550 -20551 -138 -20552 0
-20549  20550 -20551 -138 -20553 0
-20549  20550 -20551 -138 -20554 0

c  0+1 --> 1
c    (-b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧  p_138) -> (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0)
c  in CNF:
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_2
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_1
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨  b^{138, 2}_0
c  in DIMACS:
 20549  20550  20551 -138 -20552 0
 20549  20550  20551 -138 -20553 0
 20549  20550  20551 -138  20554 0

c  1+1 --> 2
c    (-b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧  b^{138, 1}_0 ∧  p_138) -> (-b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0)
c  in CNF:
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_2
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨  b^{138, 2}_1
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ -p_138 ∨ -b^{138, 2}_0
c  in DIMACS:
 20549  20550 -20551 -138 -20552 0
 20549  20550 -20551 -138  20553 0
 20549  20550 -20551 -138 -20554 0

c  2+1 --> break 
c    (-b^{138, 1}_2 ∧  b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧  p_138) -> break
c  in CNF:
c     b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ -p_138 ∨ break
c  in DIMACS:
 20549 -20550  20551 -138 1162 0


c  2-1 --> 1
c    (-b^{138, 1}_2 ∧  b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧ -p_138) -> (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0)
c  in CNF:
c     b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_2
c     b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_1
c     b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨  b^{138, 2}_0
c  in DIMACS:
 20549 -20550  20551  138 -20552 0
 20549 -20550  20551  138 -20553 0
 20549 -20550  20551  138  20554 0

c  1-1 --> 0
c    (-b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧  b^{138, 1}_0 ∧ -p_138) -> (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧ -b^{138, 2}_0)
c  in CNF:
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_2
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_1
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_0
c  in DIMACS:
 20549  20550 -20551  138 -20552 0
 20549  20550 -20551  138 -20553 0
 20549  20550 -20551  138 -20554 0

c  0-1 --> -1
c    (-b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧ -p_138) -> ( b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0)
c  in CNF:
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨  b^{138, 2}_2
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_1
c     b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨  b^{138, 2}_0
c  in DIMACS:
 20549  20550  20551  138  20552 0
 20549  20550  20551  138 -20553 0
 20549  20550  20551  138  20554 0

c  -1-1 --> -2
c    ( b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧  b^{138, 1}_0 ∧ -p_138) -> ( b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0)
c  in CNF:
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨  b^{138, 2}_2
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨  b^{138, 2}_1
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨  p_138 ∨ -b^{138, 2}_0
c  in DIMACS:
-20549  20550 -20551  138  20552 0
-20549  20550 -20551  138  20553 0
-20549  20550 -20551  138 -20554 0

c  -2-1 --> break 
c    ( b^{138, 1}_2 ∧  b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧ -p_138) -> break
c  in CNF:
c    -b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨  b^{138, 1}_0 ∨  p_138 ∨ break
c  in DIMACS:
-20549 -20550  20551  138 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 1}_2 ∧ -b^{138, 1}_1 ∧ -b^{138, 1}_0 ∧ true) 
c  in CNF:
c    -b^{138, 1}_2 ∨  b^{138, 1}_1 ∨  b^{138, 1}_0 ∨ false 
c  in DIMACS:
-20549  20550  20551  0

c  3 does not represent an automaton state.
c    -(-b^{138, 1}_2 ∧  b^{138, 1}_1 ∧  b^{138, 1}_0 ∧ true) 
c  in CNF:
c     b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ false 
c  in DIMACS:
 20549 -20550 -20551  0
c  -3 does not represent an automaton state.
c    -( b^{138, 1}_2 ∧  b^{138, 1}_1 ∧  b^{138, 1}_0 ∧ true) 
c  in CNF:
c    -b^{138, 1}_2 ∨ -b^{138, 1}_1 ∨ -b^{138, 1}_0 ∨ false 
c  in DIMACS:
-20549 -20550 -20551  0

c i = 2
c  -2+1 --> -1
c    ( b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧  p_276) -> ( b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0)
c  in CNF:
c    -b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨  b^{138, 3}_2
c    -b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_1
c    -b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨  b^{138, 3}_0
c  in DIMACS:
-20552 -20553  20554 -276  20555 0
-20552 -20553  20554 -276 -20556 0
-20552 -20553  20554 -276  20557 0

c  -1+1 --> 0
c    ( b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0 ∧  p_276) -> (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧ -b^{138, 3}_0)
c  in CNF:
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_2
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_1
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_0
c  in DIMACS:
-20552  20553 -20554 -276 -20555 0
-20552  20553 -20554 -276 -20556 0
-20552  20553 -20554 -276 -20557 0

c  0+1 --> 1
c    (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧  p_276) -> (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0)
c  in CNF:
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_2
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_1
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨  b^{138, 3}_0
c  in DIMACS:
 20552  20553  20554 -276 -20555 0
 20552  20553  20554 -276 -20556 0
 20552  20553  20554 -276  20557 0

c  1+1 --> 2
c    (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0 ∧  p_276) -> (-b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0)
c  in CNF:
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_2
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨  b^{138, 3}_1
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ -p_276 ∨ -b^{138, 3}_0
c  in DIMACS:
 20552  20553 -20554 -276 -20555 0
 20552  20553 -20554 -276  20556 0
 20552  20553 -20554 -276 -20557 0

c  2+1 --> break 
c    (-b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧  p_276) -> break
c  in CNF:
c     b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 20552 -20553  20554 -276 1162 0


c  2-1 --> 1
c    (-b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧ -p_276) -> (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0)
c  in CNF:
c     b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_2
c     b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_1
c     b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨  b^{138, 3}_0
c  in DIMACS:
 20552 -20553  20554  276 -20555 0
 20552 -20553  20554  276 -20556 0
 20552 -20553  20554  276  20557 0

c  1-1 --> 0
c    (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0 ∧ -p_276) -> (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧ -b^{138, 3}_0)
c  in CNF:
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_2
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_1
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_0
c  in DIMACS:
 20552  20553 -20554  276 -20555 0
 20552  20553 -20554  276 -20556 0
 20552  20553 -20554  276 -20557 0

c  0-1 --> -1
c    (-b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧ -p_276) -> ( b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0)
c  in CNF:
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨  b^{138, 3}_2
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_1
c     b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨  b^{138, 3}_0
c  in DIMACS:
 20552  20553  20554  276  20555 0
 20552  20553  20554  276 -20556 0
 20552  20553  20554  276  20557 0

c  -1-1 --> -2
c    ( b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧  b^{138, 2}_0 ∧ -p_276) -> ( b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0)
c  in CNF:
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨  b^{138, 3}_2
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨  b^{138, 3}_1
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨  p_276 ∨ -b^{138, 3}_0
c  in DIMACS:
-20552  20553 -20554  276  20555 0
-20552  20553 -20554  276  20556 0
-20552  20553 -20554  276 -20557 0

c  -2-1 --> break 
c    ( b^{138, 2}_2 ∧  b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨  b^{138, 2}_0 ∨  p_276 ∨ break
c  in DIMACS:
-20552 -20553  20554  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 2}_2 ∧ -b^{138, 2}_1 ∧ -b^{138, 2}_0 ∧ true) 
c  in CNF:
c    -b^{138, 2}_2 ∨  b^{138, 2}_1 ∨  b^{138, 2}_0 ∨ false 
c  in DIMACS:
-20552  20553  20554  0

c  3 does not represent an automaton state.
c    -(-b^{138, 2}_2 ∧  b^{138, 2}_1 ∧  b^{138, 2}_0 ∧ true) 
c  in CNF:
c     b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ false 
c  in DIMACS:
 20552 -20553 -20554  0
c  -3 does not represent an automaton state.
c    -( b^{138, 2}_2 ∧  b^{138, 2}_1 ∧  b^{138, 2}_0 ∧ true) 
c  in CNF:
c    -b^{138, 2}_2 ∨ -b^{138, 2}_1 ∨ -b^{138, 2}_0 ∨ false 
c  in DIMACS:
-20552 -20553 -20554  0

c i = 3
c  -2+1 --> -1
c    ( b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧  p_414) -> ( b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0)
c  in CNF:
c    -b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨  b^{138, 4}_2
c    -b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_1
c    -b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨  b^{138, 4}_0
c  in DIMACS:
-20555 -20556  20557 -414  20558 0
-20555 -20556  20557 -414 -20559 0
-20555 -20556  20557 -414  20560 0

c  -1+1 --> 0
c    ( b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0 ∧  p_414) -> (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧ -b^{138, 4}_0)
c  in CNF:
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_2
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_1
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_0
c  in DIMACS:
-20555  20556 -20557 -414 -20558 0
-20555  20556 -20557 -414 -20559 0
-20555  20556 -20557 -414 -20560 0

c  0+1 --> 1
c    (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧  p_414) -> (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0)
c  in CNF:
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_2
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_1
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨  b^{138, 4}_0
c  in DIMACS:
 20555  20556  20557 -414 -20558 0
 20555  20556  20557 -414 -20559 0
 20555  20556  20557 -414  20560 0

c  1+1 --> 2
c    (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0 ∧  p_414) -> (-b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0)
c  in CNF:
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_2
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨  b^{138, 4}_1
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ -p_414 ∨ -b^{138, 4}_0
c  in DIMACS:
 20555  20556 -20557 -414 -20558 0
 20555  20556 -20557 -414  20559 0
 20555  20556 -20557 -414 -20560 0

c  2+1 --> break 
c    (-b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧  p_414) -> break
c  in CNF:
c     b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 20555 -20556  20557 -414 1162 0


c  2-1 --> 1
c    (-b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧ -p_414) -> (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0)
c  in CNF:
c     b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_2
c     b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_1
c     b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨  b^{138, 4}_0
c  in DIMACS:
 20555 -20556  20557  414 -20558 0
 20555 -20556  20557  414 -20559 0
 20555 -20556  20557  414  20560 0

c  1-1 --> 0
c    (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0 ∧ -p_414) -> (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧ -b^{138, 4}_0)
c  in CNF:
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_2
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_1
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_0
c  in DIMACS:
 20555  20556 -20557  414 -20558 0
 20555  20556 -20557  414 -20559 0
 20555  20556 -20557  414 -20560 0

c  0-1 --> -1
c    (-b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧ -p_414) -> ( b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0)
c  in CNF:
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨  b^{138, 4}_2
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_1
c     b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨  b^{138, 4}_0
c  in DIMACS:
 20555  20556  20557  414  20558 0
 20555  20556  20557  414 -20559 0
 20555  20556  20557  414  20560 0

c  -1-1 --> -2
c    ( b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧  b^{138, 3}_0 ∧ -p_414) -> ( b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0)
c  in CNF:
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨  b^{138, 4}_2
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨  b^{138, 4}_1
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨  p_414 ∨ -b^{138, 4}_0
c  in DIMACS:
-20555  20556 -20557  414  20558 0
-20555  20556 -20557  414  20559 0
-20555  20556 -20557  414 -20560 0

c  -2-1 --> break 
c    ( b^{138, 3}_2 ∧  b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨  b^{138, 3}_0 ∨  p_414 ∨ break
c  in DIMACS:
-20555 -20556  20557  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 3}_2 ∧ -b^{138, 3}_1 ∧ -b^{138, 3}_0 ∧ true) 
c  in CNF:
c    -b^{138, 3}_2 ∨  b^{138, 3}_1 ∨  b^{138, 3}_0 ∨ false 
c  in DIMACS:
-20555  20556  20557  0

c  3 does not represent an automaton state.
c    -(-b^{138, 3}_2 ∧  b^{138, 3}_1 ∧  b^{138, 3}_0 ∧ true) 
c  in CNF:
c     b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ false 
c  in DIMACS:
 20555 -20556 -20557  0
c  -3 does not represent an automaton state.
c    -( b^{138, 3}_2 ∧  b^{138, 3}_1 ∧  b^{138, 3}_0 ∧ true) 
c  in CNF:
c    -b^{138, 3}_2 ∨ -b^{138, 3}_1 ∨ -b^{138, 3}_0 ∨ false 
c  in DIMACS:
-20555 -20556 -20557  0

c i = 4
c  -2+1 --> -1
c    ( b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧  p_552) -> ( b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0)
c  in CNF:
c    -b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨  b^{138, 5}_2
c    -b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_1
c    -b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨  b^{138, 5}_0
c  in DIMACS:
-20558 -20559  20560 -552  20561 0
-20558 -20559  20560 -552 -20562 0
-20558 -20559  20560 -552  20563 0

c  -1+1 --> 0
c    ( b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0 ∧  p_552) -> (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧ -b^{138, 5}_0)
c  in CNF:
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_2
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_1
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_0
c  in DIMACS:
-20558  20559 -20560 -552 -20561 0
-20558  20559 -20560 -552 -20562 0
-20558  20559 -20560 -552 -20563 0

c  0+1 --> 1
c    (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧  p_552) -> (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0)
c  in CNF:
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_2
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_1
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨  b^{138, 5}_0
c  in DIMACS:
 20558  20559  20560 -552 -20561 0
 20558  20559  20560 -552 -20562 0
 20558  20559  20560 -552  20563 0

c  1+1 --> 2
c    (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0 ∧  p_552) -> (-b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0)
c  in CNF:
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_2
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨  b^{138, 5}_1
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ -p_552 ∨ -b^{138, 5}_0
c  in DIMACS:
 20558  20559 -20560 -552 -20561 0
 20558  20559 -20560 -552  20562 0
 20558  20559 -20560 -552 -20563 0

c  2+1 --> break 
c    (-b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧  p_552) -> break
c  in CNF:
c     b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 20558 -20559  20560 -552 1162 0


c  2-1 --> 1
c    (-b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧ -p_552) -> (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0)
c  in CNF:
c     b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_2
c     b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_1
c     b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨  b^{138, 5}_0
c  in DIMACS:
 20558 -20559  20560  552 -20561 0
 20558 -20559  20560  552 -20562 0
 20558 -20559  20560  552  20563 0

c  1-1 --> 0
c    (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0 ∧ -p_552) -> (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧ -b^{138, 5}_0)
c  in CNF:
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_2
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_1
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_0
c  in DIMACS:
 20558  20559 -20560  552 -20561 0
 20558  20559 -20560  552 -20562 0
 20558  20559 -20560  552 -20563 0

c  0-1 --> -1
c    (-b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧ -p_552) -> ( b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0)
c  in CNF:
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨  b^{138, 5}_2
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_1
c     b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨  b^{138, 5}_0
c  in DIMACS:
 20558  20559  20560  552  20561 0
 20558  20559  20560  552 -20562 0
 20558  20559  20560  552  20563 0

c  -1-1 --> -2
c    ( b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧  b^{138, 4}_0 ∧ -p_552) -> ( b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0)
c  in CNF:
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨  b^{138, 5}_2
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨  b^{138, 5}_1
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨  p_552 ∨ -b^{138, 5}_0
c  in DIMACS:
-20558  20559 -20560  552  20561 0
-20558  20559 -20560  552  20562 0
-20558  20559 -20560  552 -20563 0

c  -2-1 --> break 
c    ( b^{138, 4}_2 ∧  b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨  b^{138, 4}_0 ∨  p_552 ∨ break
c  in DIMACS:
-20558 -20559  20560  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 4}_2 ∧ -b^{138, 4}_1 ∧ -b^{138, 4}_0 ∧ true) 
c  in CNF:
c    -b^{138, 4}_2 ∨  b^{138, 4}_1 ∨  b^{138, 4}_0 ∨ false 
c  in DIMACS:
-20558  20559  20560  0

c  3 does not represent an automaton state.
c    -(-b^{138, 4}_2 ∧  b^{138, 4}_1 ∧  b^{138, 4}_0 ∧ true) 
c  in CNF:
c     b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ false 
c  in DIMACS:
 20558 -20559 -20560  0
c  -3 does not represent an automaton state.
c    -( b^{138, 4}_2 ∧  b^{138, 4}_1 ∧  b^{138, 4}_0 ∧ true) 
c  in CNF:
c    -b^{138, 4}_2 ∨ -b^{138, 4}_1 ∨ -b^{138, 4}_0 ∨ false 
c  in DIMACS:
-20558 -20559 -20560  0

c i = 5
c  -2+1 --> -1
c    ( b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧  p_690) -> ( b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0)
c  in CNF:
c    -b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨  b^{138, 6}_2
c    -b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_1
c    -b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨  b^{138, 6}_0
c  in DIMACS:
-20561 -20562  20563 -690  20564 0
-20561 -20562  20563 -690 -20565 0
-20561 -20562  20563 -690  20566 0

c  -1+1 --> 0
c    ( b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0 ∧  p_690) -> (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧ -b^{138, 6}_0)
c  in CNF:
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_2
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_1
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_0
c  in DIMACS:
-20561  20562 -20563 -690 -20564 0
-20561  20562 -20563 -690 -20565 0
-20561  20562 -20563 -690 -20566 0

c  0+1 --> 1
c    (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧  p_690) -> (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0)
c  in CNF:
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_2
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_1
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨  b^{138, 6}_0
c  in DIMACS:
 20561  20562  20563 -690 -20564 0
 20561  20562  20563 -690 -20565 0
 20561  20562  20563 -690  20566 0

c  1+1 --> 2
c    (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0 ∧  p_690) -> (-b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0)
c  in CNF:
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_2
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨  b^{138, 6}_1
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ -p_690 ∨ -b^{138, 6}_0
c  in DIMACS:
 20561  20562 -20563 -690 -20564 0
 20561  20562 -20563 -690  20565 0
 20561  20562 -20563 -690 -20566 0

c  2+1 --> break 
c    (-b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧  p_690) -> break
c  in CNF:
c     b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 20561 -20562  20563 -690 1162 0


c  2-1 --> 1
c    (-b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧ -p_690) -> (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0)
c  in CNF:
c     b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_2
c     b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_1
c     b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨  b^{138, 6}_0
c  in DIMACS:
 20561 -20562  20563  690 -20564 0
 20561 -20562  20563  690 -20565 0
 20561 -20562  20563  690  20566 0

c  1-1 --> 0
c    (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0 ∧ -p_690) -> (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧ -b^{138, 6}_0)
c  in CNF:
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_2
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_1
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_0
c  in DIMACS:
 20561  20562 -20563  690 -20564 0
 20561  20562 -20563  690 -20565 0
 20561  20562 -20563  690 -20566 0

c  0-1 --> -1
c    (-b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧ -p_690) -> ( b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0)
c  in CNF:
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨  b^{138, 6}_2
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_1
c     b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨  b^{138, 6}_0
c  in DIMACS:
 20561  20562  20563  690  20564 0
 20561  20562  20563  690 -20565 0
 20561  20562  20563  690  20566 0

c  -1-1 --> -2
c    ( b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧  b^{138, 5}_0 ∧ -p_690) -> ( b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0)
c  in CNF:
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨  b^{138, 6}_2
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨  b^{138, 6}_1
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨  p_690 ∨ -b^{138, 6}_0
c  in DIMACS:
-20561  20562 -20563  690  20564 0
-20561  20562 -20563  690  20565 0
-20561  20562 -20563  690 -20566 0

c  -2-1 --> break 
c    ( b^{138, 5}_2 ∧  b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨  b^{138, 5}_0 ∨  p_690 ∨ break
c  in DIMACS:
-20561 -20562  20563  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 5}_2 ∧ -b^{138, 5}_1 ∧ -b^{138, 5}_0 ∧ true) 
c  in CNF:
c    -b^{138, 5}_2 ∨  b^{138, 5}_1 ∨  b^{138, 5}_0 ∨ false 
c  in DIMACS:
-20561  20562  20563  0

c  3 does not represent an automaton state.
c    -(-b^{138, 5}_2 ∧  b^{138, 5}_1 ∧  b^{138, 5}_0 ∧ true) 
c  in CNF:
c     b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ false 
c  in DIMACS:
 20561 -20562 -20563  0
c  -3 does not represent an automaton state.
c    -( b^{138, 5}_2 ∧  b^{138, 5}_1 ∧  b^{138, 5}_0 ∧ true) 
c  in CNF:
c    -b^{138, 5}_2 ∨ -b^{138, 5}_1 ∨ -b^{138, 5}_0 ∨ false 
c  in DIMACS:
-20561 -20562 -20563  0

c i = 6
c  -2+1 --> -1
c    ( b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧  p_828) -> ( b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0)
c  in CNF:
c    -b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨  b^{138, 7}_2
c    -b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_1
c    -b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨  b^{138, 7}_0
c  in DIMACS:
-20564 -20565  20566 -828  20567 0
-20564 -20565  20566 -828 -20568 0
-20564 -20565  20566 -828  20569 0

c  -1+1 --> 0
c    ( b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0 ∧  p_828) -> (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧ -b^{138, 7}_0)
c  in CNF:
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_2
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_1
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_0
c  in DIMACS:
-20564  20565 -20566 -828 -20567 0
-20564  20565 -20566 -828 -20568 0
-20564  20565 -20566 -828 -20569 0

c  0+1 --> 1
c    (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧  p_828) -> (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0)
c  in CNF:
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_2
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_1
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨  b^{138, 7}_0
c  in DIMACS:
 20564  20565  20566 -828 -20567 0
 20564  20565  20566 -828 -20568 0
 20564  20565  20566 -828  20569 0

c  1+1 --> 2
c    (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0 ∧  p_828) -> (-b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0)
c  in CNF:
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_2
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨  b^{138, 7}_1
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ -p_828 ∨ -b^{138, 7}_0
c  in DIMACS:
 20564  20565 -20566 -828 -20567 0
 20564  20565 -20566 -828  20568 0
 20564  20565 -20566 -828 -20569 0

c  2+1 --> break 
c    (-b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧  p_828) -> break
c  in CNF:
c     b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 20564 -20565  20566 -828 1162 0


c  2-1 --> 1
c    (-b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧ -p_828) -> (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0)
c  in CNF:
c     b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_2
c     b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_1
c     b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨  b^{138, 7}_0
c  in DIMACS:
 20564 -20565  20566  828 -20567 0
 20564 -20565  20566  828 -20568 0
 20564 -20565  20566  828  20569 0

c  1-1 --> 0
c    (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0 ∧ -p_828) -> (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧ -b^{138, 7}_0)
c  in CNF:
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_2
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_1
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_0
c  in DIMACS:
 20564  20565 -20566  828 -20567 0
 20564  20565 -20566  828 -20568 0
 20564  20565 -20566  828 -20569 0

c  0-1 --> -1
c    (-b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧ -p_828) -> ( b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0)
c  in CNF:
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨  b^{138, 7}_2
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_1
c     b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨  b^{138, 7}_0
c  in DIMACS:
 20564  20565  20566  828  20567 0
 20564  20565  20566  828 -20568 0
 20564  20565  20566  828  20569 0

c  -1-1 --> -2
c    ( b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧  b^{138, 6}_0 ∧ -p_828) -> ( b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0)
c  in CNF:
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨  b^{138, 7}_2
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨  b^{138, 7}_1
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨  p_828 ∨ -b^{138, 7}_0
c  in DIMACS:
-20564  20565 -20566  828  20567 0
-20564  20565 -20566  828  20568 0
-20564  20565 -20566  828 -20569 0

c  -2-1 --> break 
c    ( b^{138, 6}_2 ∧  b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨  b^{138, 6}_0 ∨  p_828 ∨ break
c  in DIMACS:
-20564 -20565  20566  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 6}_2 ∧ -b^{138, 6}_1 ∧ -b^{138, 6}_0 ∧ true) 
c  in CNF:
c    -b^{138, 6}_2 ∨  b^{138, 6}_1 ∨  b^{138, 6}_0 ∨ false 
c  in DIMACS:
-20564  20565  20566  0

c  3 does not represent an automaton state.
c    -(-b^{138, 6}_2 ∧  b^{138, 6}_1 ∧  b^{138, 6}_0 ∧ true) 
c  in CNF:
c     b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ false 
c  in DIMACS:
 20564 -20565 -20566  0
c  -3 does not represent an automaton state.
c    -( b^{138, 6}_2 ∧  b^{138, 6}_1 ∧  b^{138, 6}_0 ∧ true) 
c  in CNF:
c    -b^{138, 6}_2 ∨ -b^{138, 6}_1 ∨ -b^{138, 6}_0 ∨ false 
c  in DIMACS:
-20564 -20565 -20566  0

c i = 7
c  -2+1 --> -1
c    ( b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧  p_966) -> ( b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0)
c  in CNF:
c    -b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨  b^{138, 8}_2
c    -b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_1
c    -b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨  b^{138, 8}_0
c  in DIMACS:
-20567 -20568  20569 -966  20570 0
-20567 -20568  20569 -966 -20571 0
-20567 -20568  20569 -966  20572 0

c  -1+1 --> 0
c    ( b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0 ∧  p_966) -> (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧ -b^{138, 8}_0)
c  in CNF:
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_2
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_1
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_0
c  in DIMACS:
-20567  20568 -20569 -966 -20570 0
-20567  20568 -20569 -966 -20571 0
-20567  20568 -20569 -966 -20572 0

c  0+1 --> 1
c    (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧  p_966) -> (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0)
c  in CNF:
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_2
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_1
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨  b^{138, 8}_0
c  in DIMACS:
 20567  20568  20569 -966 -20570 0
 20567  20568  20569 -966 -20571 0
 20567  20568  20569 -966  20572 0

c  1+1 --> 2
c    (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0 ∧  p_966) -> (-b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0)
c  in CNF:
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_2
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨  b^{138, 8}_1
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ -p_966 ∨ -b^{138, 8}_0
c  in DIMACS:
 20567  20568 -20569 -966 -20570 0
 20567  20568 -20569 -966  20571 0
 20567  20568 -20569 -966 -20572 0

c  2+1 --> break 
c    (-b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧  p_966) -> break
c  in CNF:
c     b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 20567 -20568  20569 -966 1162 0


c  2-1 --> 1
c    (-b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧ -p_966) -> (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0)
c  in CNF:
c     b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_2
c     b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_1
c     b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨  b^{138, 8}_0
c  in DIMACS:
 20567 -20568  20569  966 -20570 0
 20567 -20568  20569  966 -20571 0
 20567 -20568  20569  966  20572 0

c  1-1 --> 0
c    (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0 ∧ -p_966) -> (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧ -b^{138, 8}_0)
c  in CNF:
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_2
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_1
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_0
c  in DIMACS:
 20567  20568 -20569  966 -20570 0
 20567  20568 -20569  966 -20571 0
 20567  20568 -20569  966 -20572 0

c  0-1 --> -1
c    (-b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧ -p_966) -> ( b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0)
c  in CNF:
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨  b^{138, 8}_2
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_1
c     b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨  b^{138, 8}_0
c  in DIMACS:
 20567  20568  20569  966  20570 0
 20567  20568  20569  966 -20571 0
 20567  20568  20569  966  20572 0

c  -1-1 --> -2
c    ( b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧  b^{138, 7}_0 ∧ -p_966) -> ( b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0)
c  in CNF:
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨  b^{138, 8}_2
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨  b^{138, 8}_1
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨  p_966 ∨ -b^{138, 8}_0
c  in DIMACS:
-20567  20568 -20569  966  20570 0
-20567  20568 -20569  966  20571 0
-20567  20568 -20569  966 -20572 0

c  -2-1 --> break 
c    ( b^{138, 7}_2 ∧  b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨  b^{138, 7}_0 ∨  p_966 ∨ break
c  in DIMACS:
-20567 -20568  20569  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 7}_2 ∧ -b^{138, 7}_1 ∧ -b^{138, 7}_0 ∧ true) 
c  in CNF:
c    -b^{138, 7}_2 ∨  b^{138, 7}_1 ∨  b^{138, 7}_0 ∨ false 
c  in DIMACS:
-20567  20568  20569  0

c  3 does not represent an automaton state.
c    -(-b^{138, 7}_2 ∧  b^{138, 7}_1 ∧  b^{138, 7}_0 ∧ true) 
c  in CNF:
c     b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ false 
c  in DIMACS:
 20567 -20568 -20569  0
c  -3 does not represent an automaton state.
c    -( b^{138, 7}_2 ∧  b^{138, 7}_1 ∧  b^{138, 7}_0 ∧ true) 
c  in CNF:
c    -b^{138, 7}_2 ∨ -b^{138, 7}_1 ∨ -b^{138, 7}_0 ∨ false 
c  in DIMACS:
-20567 -20568 -20569  0

c i = 8
c  -2+1 --> -1
c    ( b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧  p_1104) -> ( b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧  b^{138, 9}_0)
c  in CNF:
c    -b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨  b^{138, 9}_2
c    -b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_1
c    -b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨  b^{138, 9}_0
c  in DIMACS:
-20570 -20571  20572 -1104  20573 0
-20570 -20571  20572 -1104 -20574 0
-20570 -20571  20572 -1104  20575 0

c  -1+1 --> 0
c    ( b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0 ∧  p_1104) -> (-b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧ -b^{138, 9}_0)
c  in CNF:
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_2
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_1
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_0
c  in DIMACS:
-20570  20571 -20572 -1104 -20573 0
-20570  20571 -20572 -1104 -20574 0
-20570  20571 -20572 -1104 -20575 0

c  0+1 --> 1
c    (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧  p_1104) -> (-b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧  b^{138, 9}_0)
c  in CNF:
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_2
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_1
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨  b^{138, 9}_0
c  in DIMACS:
 20570  20571  20572 -1104 -20573 0
 20570  20571  20572 -1104 -20574 0
 20570  20571  20572 -1104  20575 0

c  1+1 --> 2
c    (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0 ∧  p_1104) -> (-b^{138, 9}_2 ∧  b^{138, 9}_1 ∧ -b^{138, 9}_0)
c  in CNF:
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_2
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨  b^{138, 9}_1
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ -p_1104 ∨ -b^{138, 9}_0
c  in DIMACS:
 20570  20571 -20572 -1104 -20573 0
 20570  20571 -20572 -1104  20574 0
 20570  20571 -20572 -1104 -20575 0

c  2+1 --> break 
c    (-b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 20570 -20571  20572 -1104 1162 0


c  2-1 --> 1
c    (-b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧ -p_1104) -> (-b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧  b^{138, 9}_0)
c  in CNF:
c     b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_2
c     b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_1
c     b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨  b^{138, 9}_0
c  in DIMACS:
 20570 -20571  20572  1104 -20573 0
 20570 -20571  20572  1104 -20574 0
 20570 -20571  20572  1104  20575 0

c  1-1 --> 0
c    (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0 ∧ -p_1104) -> (-b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧ -b^{138, 9}_0)
c  in CNF:
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_2
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_1
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_0
c  in DIMACS:
 20570  20571 -20572  1104 -20573 0
 20570  20571 -20572  1104 -20574 0
 20570  20571 -20572  1104 -20575 0

c  0-1 --> -1
c    (-b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧ -p_1104) -> ( b^{138, 9}_2 ∧ -b^{138, 9}_1 ∧  b^{138, 9}_0)
c  in CNF:
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨  b^{138, 9}_2
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_1
c     b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨  b^{138, 9}_0
c  in DIMACS:
 20570  20571  20572  1104  20573 0
 20570  20571  20572  1104 -20574 0
 20570  20571  20572  1104  20575 0

c  -1-1 --> -2
c    ( b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧  b^{138, 8}_0 ∧ -p_1104) -> ( b^{138, 9}_2 ∧  b^{138, 9}_1 ∧ -b^{138, 9}_0)
c  in CNF:
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨  b^{138, 9}_2
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨  b^{138, 9}_1
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨  p_1104 ∨ -b^{138, 9}_0
c  in DIMACS:
-20570  20571 -20572  1104  20573 0
-20570  20571 -20572  1104  20574 0
-20570  20571 -20572  1104 -20575 0

c  -2-1 --> break 
c    ( b^{138, 8}_2 ∧  b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨  b^{138, 8}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-20570 -20571  20572  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{138, 8}_2 ∧ -b^{138, 8}_1 ∧ -b^{138, 8}_0 ∧ true) 
c  in CNF:
c    -b^{138, 8}_2 ∨  b^{138, 8}_1 ∨  b^{138, 8}_0 ∨ false 
c  in DIMACS:
-20570  20571  20572  0

c  3 does not represent an automaton state.
c    -(-b^{138, 8}_2 ∧  b^{138, 8}_1 ∧  b^{138, 8}_0 ∧ true) 
c  in CNF:
c     b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ false 
c  in DIMACS:
 20570 -20571 -20572  0
c  -3 does not represent an automaton state.
c    -( b^{138, 8}_2 ∧  b^{138, 8}_1 ∧  b^{138, 8}_0 ∧ true) 
c  in CNF:
c    -b^{138, 8}_2 ∨ -b^{138, 8}_1 ∨ -b^{138, 8}_0 ∨ false 
c  in DIMACS:
-20570 -20571 -20572  0

c INIT for k = 139
c    -b^{139, 1}_2
c    -b^{139, 1}_1
c    -b^{139, 1}_0
c  in DIMACS:
-20576 0
-20577 0
-20578 0

c Transitions for k = 139
c i = 1
c  -2+1 --> -1
c    ( b^{139, 1}_2 ∧  b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧  p_139) -> ( b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0)
c  in CNF:
c    -b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨  b^{139, 2}_2
c    -b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_1
c    -b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨  b^{139, 2}_0
c  in DIMACS:
-20576 -20577  20578 -139  20579 0
-20576 -20577  20578 -139 -20580 0
-20576 -20577  20578 -139  20581 0

c  -1+1 --> 0
c    ( b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧  b^{139, 1}_0 ∧  p_139) -> (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧ -b^{139, 2}_0)
c  in CNF:
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_2
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_1
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_0
c  in DIMACS:
-20576  20577 -20578 -139 -20579 0
-20576  20577 -20578 -139 -20580 0
-20576  20577 -20578 -139 -20581 0

c  0+1 --> 1
c    (-b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧  p_139) -> (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0)
c  in CNF:
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_2
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_1
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨  b^{139, 2}_0
c  in DIMACS:
 20576  20577  20578 -139 -20579 0
 20576  20577  20578 -139 -20580 0
 20576  20577  20578 -139  20581 0

c  1+1 --> 2
c    (-b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧  b^{139, 1}_0 ∧  p_139) -> (-b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0)
c  in CNF:
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_2
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨  b^{139, 2}_1
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ -p_139 ∨ -b^{139, 2}_0
c  in DIMACS:
 20576  20577 -20578 -139 -20579 0
 20576  20577 -20578 -139  20580 0
 20576  20577 -20578 -139 -20581 0

c  2+1 --> break 
c    (-b^{139, 1}_2 ∧  b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧  p_139) -> break
c  in CNF:
c     b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ -p_139 ∨ break
c  in DIMACS:
 20576 -20577  20578 -139 1162 0


c  2-1 --> 1
c    (-b^{139, 1}_2 ∧  b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧ -p_139) -> (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0)
c  in CNF:
c     b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_2
c     b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_1
c     b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨  b^{139, 2}_0
c  in DIMACS:
 20576 -20577  20578  139 -20579 0
 20576 -20577  20578  139 -20580 0
 20576 -20577  20578  139  20581 0

c  1-1 --> 0
c    (-b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧  b^{139, 1}_0 ∧ -p_139) -> (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧ -b^{139, 2}_0)
c  in CNF:
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_2
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_1
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_0
c  in DIMACS:
 20576  20577 -20578  139 -20579 0
 20576  20577 -20578  139 -20580 0
 20576  20577 -20578  139 -20581 0

c  0-1 --> -1
c    (-b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧ -p_139) -> ( b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0)
c  in CNF:
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨  b^{139, 2}_2
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_1
c     b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨  b^{139, 2}_0
c  in DIMACS:
 20576  20577  20578  139  20579 0
 20576  20577  20578  139 -20580 0
 20576  20577  20578  139  20581 0

c  -1-1 --> -2
c    ( b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧  b^{139, 1}_0 ∧ -p_139) -> ( b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0)
c  in CNF:
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨  b^{139, 2}_2
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨  b^{139, 2}_1
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨  p_139 ∨ -b^{139, 2}_0
c  in DIMACS:
-20576  20577 -20578  139  20579 0
-20576  20577 -20578  139  20580 0
-20576  20577 -20578  139 -20581 0

c  -2-1 --> break 
c    ( b^{139, 1}_2 ∧  b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧ -p_139) -> break
c  in CNF:
c    -b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨  b^{139, 1}_0 ∨  p_139 ∨ break
c  in DIMACS:
-20576 -20577  20578  139 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 1}_2 ∧ -b^{139, 1}_1 ∧ -b^{139, 1}_0 ∧ true) 
c  in CNF:
c    -b^{139, 1}_2 ∨  b^{139, 1}_1 ∨  b^{139, 1}_0 ∨ false 
c  in DIMACS:
-20576  20577  20578  0

c  3 does not represent an automaton state.
c    -(-b^{139, 1}_2 ∧  b^{139, 1}_1 ∧  b^{139, 1}_0 ∧ true) 
c  in CNF:
c     b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ false 
c  in DIMACS:
 20576 -20577 -20578  0
c  -3 does not represent an automaton state.
c    -( b^{139, 1}_2 ∧  b^{139, 1}_1 ∧  b^{139, 1}_0 ∧ true) 
c  in CNF:
c    -b^{139, 1}_2 ∨ -b^{139, 1}_1 ∨ -b^{139, 1}_0 ∨ false 
c  in DIMACS:
-20576 -20577 -20578  0

c i = 2
c  -2+1 --> -1
c    ( b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧  p_278) -> ( b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0)
c  in CNF:
c    -b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨  b^{139, 3}_2
c    -b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_1
c    -b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨  b^{139, 3}_0
c  in DIMACS:
-20579 -20580  20581 -278  20582 0
-20579 -20580  20581 -278 -20583 0
-20579 -20580  20581 -278  20584 0

c  -1+1 --> 0
c    ( b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0 ∧  p_278) -> (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧ -b^{139, 3}_0)
c  in CNF:
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_2
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_1
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_0
c  in DIMACS:
-20579  20580 -20581 -278 -20582 0
-20579  20580 -20581 -278 -20583 0
-20579  20580 -20581 -278 -20584 0

c  0+1 --> 1
c    (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧  p_278) -> (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0)
c  in CNF:
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_2
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_1
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨  b^{139, 3}_0
c  in DIMACS:
 20579  20580  20581 -278 -20582 0
 20579  20580  20581 -278 -20583 0
 20579  20580  20581 -278  20584 0

c  1+1 --> 2
c    (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0 ∧  p_278) -> (-b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0)
c  in CNF:
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_2
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨  b^{139, 3}_1
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ -p_278 ∨ -b^{139, 3}_0
c  in DIMACS:
 20579  20580 -20581 -278 -20582 0
 20579  20580 -20581 -278  20583 0
 20579  20580 -20581 -278 -20584 0

c  2+1 --> break 
c    (-b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧  p_278) -> break
c  in CNF:
c     b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ -p_278 ∨ break
c  in DIMACS:
 20579 -20580  20581 -278 1162 0


c  2-1 --> 1
c    (-b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧ -p_278) -> (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0)
c  in CNF:
c     b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_2
c     b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_1
c     b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨  b^{139, 3}_0
c  in DIMACS:
 20579 -20580  20581  278 -20582 0
 20579 -20580  20581  278 -20583 0
 20579 -20580  20581  278  20584 0

c  1-1 --> 0
c    (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0 ∧ -p_278) -> (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧ -b^{139, 3}_0)
c  in CNF:
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_2
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_1
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_0
c  in DIMACS:
 20579  20580 -20581  278 -20582 0
 20579  20580 -20581  278 -20583 0
 20579  20580 -20581  278 -20584 0

c  0-1 --> -1
c    (-b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧ -p_278) -> ( b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0)
c  in CNF:
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨  b^{139, 3}_2
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_1
c     b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨  b^{139, 3}_0
c  in DIMACS:
 20579  20580  20581  278  20582 0
 20579  20580  20581  278 -20583 0
 20579  20580  20581  278  20584 0

c  -1-1 --> -2
c    ( b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧  b^{139, 2}_0 ∧ -p_278) -> ( b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0)
c  in CNF:
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨  b^{139, 3}_2
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨  b^{139, 3}_1
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨  p_278 ∨ -b^{139, 3}_0
c  in DIMACS:
-20579  20580 -20581  278  20582 0
-20579  20580 -20581  278  20583 0
-20579  20580 -20581  278 -20584 0

c  -2-1 --> break 
c    ( b^{139, 2}_2 ∧  b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧ -p_278) -> break
c  in CNF:
c    -b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨  b^{139, 2}_0 ∨  p_278 ∨ break
c  in DIMACS:
-20579 -20580  20581  278 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 2}_2 ∧ -b^{139, 2}_1 ∧ -b^{139, 2}_0 ∧ true) 
c  in CNF:
c    -b^{139, 2}_2 ∨  b^{139, 2}_1 ∨  b^{139, 2}_0 ∨ false 
c  in DIMACS:
-20579  20580  20581  0

c  3 does not represent an automaton state.
c    -(-b^{139, 2}_2 ∧  b^{139, 2}_1 ∧  b^{139, 2}_0 ∧ true) 
c  in CNF:
c     b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ false 
c  in DIMACS:
 20579 -20580 -20581  0
c  -3 does not represent an automaton state.
c    -( b^{139, 2}_2 ∧  b^{139, 2}_1 ∧  b^{139, 2}_0 ∧ true) 
c  in CNF:
c    -b^{139, 2}_2 ∨ -b^{139, 2}_1 ∨ -b^{139, 2}_0 ∨ false 
c  in DIMACS:
-20579 -20580 -20581  0

c i = 3
c  -2+1 --> -1
c    ( b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧  p_417) -> ( b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0)
c  in CNF:
c    -b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨  b^{139, 4}_2
c    -b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_1
c    -b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨  b^{139, 4}_0
c  in DIMACS:
-20582 -20583  20584 -417  20585 0
-20582 -20583  20584 -417 -20586 0
-20582 -20583  20584 -417  20587 0

c  -1+1 --> 0
c    ( b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0 ∧  p_417) -> (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧ -b^{139, 4}_0)
c  in CNF:
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_2
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_1
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_0
c  in DIMACS:
-20582  20583 -20584 -417 -20585 0
-20582  20583 -20584 -417 -20586 0
-20582  20583 -20584 -417 -20587 0

c  0+1 --> 1
c    (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧  p_417) -> (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0)
c  in CNF:
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_2
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_1
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨  b^{139, 4}_0
c  in DIMACS:
 20582  20583  20584 -417 -20585 0
 20582  20583  20584 -417 -20586 0
 20582  20583  20584 -417  20587 0

c  1+1 --> 2
c    (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0 ∧  p_417) -> (-b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0)
c  in CNF:
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_2
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨  b^{139, 4}_1
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ -p_417 ∨ -b^{139, 4}_0
c  in DIMACS:
 20582  20583 -20584 -417 -20585 0
 20582  20583 -20584 -417  20586 0
 20582  20583 -20584 -417 -20587 0

c  2+1 --> break 
c    (-b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧  p_417) -> break
c  in CNF:
c     b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ -p_417 ∨ break
c  in DIMACS:
 20582 -20583  20584 -417 1162 0


c  2-1 --> 1
c    (-b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧ -p_417) -> (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0)
c  in CNF:
c     b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_2
c     b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_1
c     b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨  b^{139, 4}_0
c  in DIMACS:
 20582 -20583  20584  417 -20585 0
 20582 -20583  20584  417 -20586 0
 20582 -20583  20584  417  20587 0

c  1-1 --> 0
c    (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0 ∧ -p_417) -> (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧ -b^{139, 4}_0)
c  in CNF:
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_2
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_1
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_0
c  in DIMACS:
 20582  20583 -20584  417 -20585 0
 20582  20583 -20584  417 -20586 0
 20582  20583 -20584  417 -20587 0

c  0-1 --> -1
c    (-b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧ -p_417) -> ( b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0)
c  in CNF:
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨  b^{139, 4}_2
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_1
c     b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨  b^{139, 4}_0
c  in DIMACS:
 20582  20583  20584  417  20585 0
 20582  20583  20584  417 -20586 0
 20582  20583  20584  417  20587 0

c  -1-1 --> -2
c    ( b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧  b^{139, 3}_0 ∧ -p_417) -> ( b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0)
c  in CNF:
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨  b^{139, 4}_2
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨  b^{139, 4}_1
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨  p_417 ∨ -b^{139, 4}_0
c  in DIMACS:
-20582  20583 -20584  417  20585 0
-20582  20583 -20584  417  20586 0
-20582  20583 -20584  417 -20587 0

c  -2-1 --> break 
c    ( b^{139, 3}_2 ∧  b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧ -p_417) -> break
c  in CNF:
c    -b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨  b^{139, 3}_0 ∨  p_417 ∨ break
c  in DIMACS:
-20582 -20583  20584  417 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 3}_2 ∧ -b^{139, 3}_1 ∧ -b^{139, 3}_0 ∧ true) 
c  in CNF:
c    -b^{139, 3}_2 ∨  b^{139, 3}_1 ∨  b^{139, 3}_0 ∨ false 
c  in DIMACS:
-20582  20583  20584  0

c  3 does not represent an automaton state.
c    -(-b^{139, 3}_2 ∧  b^{139, 3}_1 ∧  b^{139, 3}_0 ∧ true) 
c  in CNF:
c     b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ false 
c  in DIMACS:
 20582 -20583 -20584  0
c  -3 does not represent an automaton state.
c    -( b^{139, 3}_2 ∧  b^{139, 3}_1 ∧  b^{139, 3}_0 ∧ true) 
c  in CNF:
c    -b^{139, 3}_2 ∨ -b^{139, 3}_1 ∨ -b^{139, 3}_0 ∨ false 
c  in DIMACS:
-20582 -20583 -20584  0

c i = 4
c  -2+1 --> -1
c    ( b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧  p_556) -> ( b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0)
c  in CNF:
c    -b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨  b^{139, 5}_2
c    -b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_1
c    -b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨  b^{139, 5}_0
c  in DIMACS:
-20585 -20586  20587 -556  20588 0
-20585 -20586  20587 -556 -20589 0
-20585 -20586  20587 -556  20590 0

c  -1+1 --> 0
c    ( b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0 ∧  p_556) -> (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧ -b^{139, 5}_0)
c  in CNF:
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_2
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_1
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_0
c  in DIMACS:
-20585  20586 -20587 -556 -20588 0
-20585  20586 -20587 -556 -20589 0
-20585  20586 -20587 -556 -20590 0

c  0+1 --> 1
c    (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧  p_556) -> (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0)
c  in CNF:
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_2
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_1
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨  b^{139, 5}_0
c  in DIMACS:
 20585  20586  20587 -556 -20588 0
 20585  20586  20587 -556 -20589 0
 20585  20586  20587 -556  20590 0

c  1+1 --> 2
c    (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0 ∧  p_556) -> (-b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0)
c  in CNF:
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_2
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨  b^{139, 5}_1
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ -p_556 ∨ -b^{139, 5}_0
c  in DIMACS:
 20585  20586 -20587 -556 -20588 0
 20585  20586 -20587 -556  20589 0
 20585  20586 -20587 -556 -20590 0

c  2+1 --> break 
c    (-b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧  p_556) -> break
c  in CNF:
c     b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ -p_556 ∨ break
c  in DIMACS:
 20585 -20586  20587 -556 1162 0


c  2-1 --> 1
c    (-b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧ -p_556) -> (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0)
c  in CNF:
c     b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_2
c     b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_1
c     b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨  b^{139, 5}_0
c  in DIMACS:
 20585 -20586  20587  556 -20588 0
 20585 -20586  20587  556 -20589 0
 20585 -20586  20587  556  20590 0

c  1-1 --> 0
c    (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0 ∧ -p_556) -> (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧ -b^{139, 5}_0)
c  in CNF:
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_2
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_1
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_0
c  in DIMACS:
 20585  20586 -20587  556 -20588 0
 20585  20586 -20587  556 -20589 0
 20585  20586 -20587  556 -20590 0

c  0-1 --> -1
c    (-b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧ -p_556) -> ( b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0)
c  in CNF:
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨  b^{139, 5}_2
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_1
c     b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨  b^{139, 5}_0
c  in DIMACS:
 20585  20586  20587  556  20588 0
 20585  20586  20587  556 -20589 0
 20585  20586  20587  556  20590 0

c  -1-1 --> -2
c    ( b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧  b^{139, 4}_0 ∧ -p_556) -> ( b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0)
c  in CNF:
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨  b^{139, 5}_2
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨  b^{139, 5}_1
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨  p_556 ∨ -b^{139, 5}_0
c  in DIMACS:
-20585  20586 -20587  556  20588 0
-20585  20586 -20587  556  20589 0
-20585  20586 -20587  556 -20590 0

c  -2-1 --> break 
c    ( b^{139, 4}_2 ∧  b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧ -p_556) -> break
c  in CNF:
c    -b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨  b^{139, 4}_0 ∨  p_556 ∨ break
c  in DIMACS:
-20585 -20586  20587  556 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 4}_2 ∧ -b^{139, 4}_1 ∧ -b^{139, 4}_0 ∧ true) 
c  in CNF:
c    -b^{139, 4}_2 ∨  b^{139, 4}_1 ∨  b^{139, 4}_0 ∨ false 
c  in DIMACS:
-20585  20586  20587  0

c  3 does not represent an automaton state.
c    -(-b^{139, 4}_2 ∧  b^{139, 4}_1 ∧  b^{139, 4}_0 ∧ true) 
c  in CNF:
c     b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ false 
c  in DIMACS:
 20585 -20586 -20587  0
c  -3 does not represent an automaton state.
c    -( b^{139, 4}_2 ∧  b^{139, 4}_1 ∧  b^{139, 4}_0 ∧ true) 
c  in CNF:
c    -b^{139, 4}_2 ∨ -b^{139, 4}_1 ∨ -b^{139, 4}_0 ∨ false 
c  in DIMACS:
-20585 -20586 -20587  0

c i = 5
c  -2+1 --> -1
c    ( b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧  p_695) -> ( b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0)
c  in CNF:
c    -b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨  b^{139, 6}_2
c    -b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_1
c    -b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨  b^{139, 6}_0
c  in DIMACS:
-20588 -20589  20590 -695  20591 0
-20588 -20589  20590 -695 -20592 0
-20588 -20589  20590 -695  20593 0

c  -1+1 --> 0
c    ( b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0 ∧  p_695) -> (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧ -b^{139, 6}_0)
c  in CNF:
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_2
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_1
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_0
c  in DIMACS:
-20588  20589 -20590 -695 -20591 0
-20588  20589 -20590 -695 -20592 0
-20588  20589 -20590 -695 -20593 0

c  0+1 --> 1
c    (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧  p_695) -> (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0)
c  in CNF:
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_2
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_1
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨  b^{139, 6}_0
c  in DIMACS:
 20588  20589  20590 -695 -20591 0
 20588  20589  20590 -695 -20592 0
 20588  20589  20590 -695  20593 0

c  1+1 --> 2
c    (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0 ∧  p_695) -> (-b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0)
c  in CNF:
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_2
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨  b^{139, 6}_1
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ -p_695 ∨ -b^{139, 6}_0
c  in DIMACS:
 20588  20589 -20590 -695 -20591 0
 20588  20589 -20590 -695  20592 0
 20588  20589 -20590 -695 -20593 0

c  2+1 --> break 
c    (-b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧  p_695) -> break
c  in CNF:
c     b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ -p_695 ∨ break
c  in DIMACS:
 20588 -20589  20590 -695 1162 0


c  2-1 --> 1
c    (-b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧ -p_695) -> (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0)
c  in CNF:
c     b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_2
c     b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_1
c     b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨  b^{139, 6}_0
c  in DIMACS:
 20588 -20589  20590  695 -20591 0
 20588 -20589  20590  695 -20592 0
 20588 -20589  20590  695  20593 0

c  1-1 --> 0
c    (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0 ∧ -p_695) -> (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧ -b^{139, 6}_0)
c  in CNF:
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_2
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_1
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_0
c  in DIMACS:
 20588  20589 -20590  695 -20591 0
 20588  20589 -20590  695 -20592 0
 20588  20589 -20590  695 -20593 0

c  0-1 --> -1
c    (-b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧ -p_695) -> ( b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0)
c  in CNF:
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨  b^{139, 6}_2
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_1
c     b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨  b^{139, 6}_0
c  in DIMACS:
 20588  20589  20590  695  20591 0
 20588  20589  20590  695 -20592 0
 20588  20589  20590  695  20593 0

c  -1-1 --> -2
c    ( b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧  b^{139, 5}_0 ∧ -p_695) -> ( b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0)
c  in CNF:
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨  b^{139, 6}_2
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨  b^{139, 6}_1
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨  p_695 ∨ -b^{139, 6}_0
c  in DIMACS:
-20588  20589 -20590  695  20591 0
-20588  20589 -20590  695  20592 0
-20588  20589 -20590  695 -20593 0

c  -2-1 --> break 
c    ( b^{139, 5}_2 ∧  b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧ -p_695) -> break
c  in CNF:
c    -b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨  b^{139, 5}_0 ∨  p_695 ∨ break
c  in DIMACS:
-20588 -20589  20590  695 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 5}_2 ∧ -b^{139, 5}_1 ∧ -b^{139, 5}_0 ∧ true) 
c  in CNF:
c    -b^{139, 5}_2 ∨  b^{139, 5}_1 ∨  b^{139, 5}_0 ∨ false 
c  in DIMACS:
-20588  20589  20590  0

c  3 does not represent an automaton state.
c    -(-b^{139, 5}_2 ∧  b^{139, 5}_1 ∧  b^{139, 5}_0 ∧ true) 
c  in CNF:
c     b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ false 
c  in DIMACS:
 20588 -20589 -20590  0
c  -3 does not represent an automaton state.
c    -( b^{139, 5}_2 ∧  b^{139, 5}_1 ∧  b^{139, 5}_0 ∧ true) 
c  in CNF:
c    -b^{139, 5}_2 ∨ -b^{139, 5}_1 ∨ -b^{139, 5}_0 ∨ false 
c  in DIMACS:
-20588 -20589 -20590  0

c i = 6
c  -2+1 --> -1
c    ( b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧  p_834) -> ( b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0)
c  in CNF:
c    -b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨  b^{139, 7}_2
c    -b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_1
c    -b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨  b^{139, 7}_0
c  in DIMACS:
-20591 -20592  20593 -834  20594 0
-20591 -20592  20593 -834 -20595 0
-20591 -20592  20593 -834  20596 0

c  -1+1 --> 0
c    ( b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0 ∧  p_834) -> (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧ -b^{139, 7}_0)
c  in CNF:
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_2
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_1
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_0
c  in DIMACS:
-20591  20592 -20593 -834 -20594 0
-20591  20592 -20593 -834 -20595 0
-20591  20592 -20593 -834 -20596 0

c  0+1 --> 1
c    (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧  p_834) -> (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0)
c  in CNF:
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_2
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_1
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨  b^{139, 7}_0
c  in DIMACS:
 20591  20592  20593 -834 -20594 0
 20591  20592  20593 -834 -20595 0
 20591  20592  20593 -834  20596 0

c  1+1 --> 2
c    (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0 ∧  p_834) -> (-b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0)
c  in CNF:
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_2
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨  b^{139, 7}_1
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ -p_834 ∨ -b^{139, 7}_0
c  in DIMACS:
 20591  20592 -20593 -834 -20594 0
 20591  20592 -20593 -834  20595 0
 20591  20592 -20593 -834 -20596 0

c  2+1 --> break 
c    (-b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧  p_834) -> break
c  in CNF:
c     b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 20591 -20592  20593 -834 1162 0


c  2-1 --> 1
c    (-b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧ -p_834) -> (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0)
c  in CNF:
c     b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_2
c     b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_1
c     b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨  b^{139, 7}_0
c  in DIMACS:
 20591 -20592  20593  834 -20594 0
 20591 -20592  20593  834 -20595 0
 20591 -20592  20593  834  20596 0

c  1-1 --> 0
c    (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0 ∧ -p_834) -> (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧ -b^{139, 7}_0)
c  in CNF:
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_2
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_1
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_0
c  in DIMACS:
 20591  20592 -20593  834 -20594 0
 20591  20592 -20593  834 -20595 0
 20591  20592 -20593  834 -20596 0

c  0-1 --> -1
c    (-b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧ -p_834) -> ( b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0)
c  in CNF:
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨  b^{139, 7}_2
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_1
c     b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨  b^{139, 7}_0
c  in DIMACS:
 20591  20592  20593  834  20594 0
 20591  20592  20593  834 -20595 0
 20591  20592  20593  834  20596 0

c  -1-1 --> -2
c    ( b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧  b^{139, 6}_0 ∧ -p_834) -> ( b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0)
c  in CNF:
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨  b^{139, 7}_2
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨  b^{139, 7}_1
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨  p_834 ∨ -b^{139, 7}_0
c  in DIMACS:
-20591  20592 -20593  834  20594 0
-20591  20592 -20593  834  20595 0
-20591  20592 -20593  834 -20596 0

c  -2-1 --> break 
c    ( b^{139, 6}_2 ∧  b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨  b^{139, 6}_0 ∨  p_834 ∨ break
c  in DIMACS:
-20591 -20592  20593  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 6}_2 ∧ -b^{139, 6}_1 ∧ -b^{139, 6}_0 ∧ true) 
c  in CNF:
c    -b^{139, 6}_2 ∨  b^{139, 6}_1 ∨  b^{139, 6}_0 ∨ false 
c  in DIMACS:
-20591  20592  20593  0

c  3 does not represent an automaton state.
c    -(-b^{139, 6}_2 ∧  b^{139, 6}_1 ∧  b^{139, 6}_0 ∧ true) 
c  in CNF:
c     b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ false 
c  in DIMACS:
 20591 -20592 -20593  0
c  -3 does not represent an automaton state.
c    -( b^{139, 6}_2 ∧  b^{139, 6}_1 ∧  b^{139, 6}_0 ∧ true) 
c  in CNF:
c    -b^{139, 6}_2 ∨ -b^{139, 6}_1 ∨ -b^{139, 6}_0 ∨ false 
c  in DIMACS:
-20591 -20592 -20593  0

c i = 7
c  -2+1 --> -1
c    ( b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧  p_973) -> ( b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0)
c  in CNF:
c    -b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨  b^{139, 8}_2
c    -b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_1
c    -b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨  b^{139, 8}_0
c  in DIMACS:
-20594 -20595  20596 -973  20597 0
-20594 -20595  20596 -973 -20598 0
-20594 -20595  20596 -973  20599 0

c  -1+1 --> 0
c    ( b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0 ∧  p_973) -> (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧ -b^{139, 8}_0)
c  in CNF:
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_2
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_1
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_0
c  in DIMACS:
-20594  20595 -20596 -973 -20597 0
-20594  20595 -20596 -973 -20598 0
-20594  20595 -20596 -973 -20599 0

c  0+1 --> 1
c    (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧  p_973) -> (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0)
c  in CNF:
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_2
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_1
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨  b^{139, 8}_0
c  in DIMACS:
 20594  20595  20596 -973 -20597 0
 20594  20595  20596 -973 -20598 0
 20594  20595  20596 -973  20599 0

c  1+1 --> 2
c    (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0 ∧  p_973) -> (-b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0)
c  in CNF:
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_2
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨  b^{139, 8}_1
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ -p_973 ∨ -b^{139, 8}_0
c  in DIMACS:
 20594  20595 -20596 -973 -20597 0
 20594  20595 -20596 -973  20598 0
 20594  20595 -20596 -973 -20599 0

c  2+1 --> break 
c    (-b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧  p_973) -> break
c  in CNF:
c     b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ -p_973 ∨ break
c  in DIMACS:
 20594 -20595  20596 -973 1162 0


c  2-1 --> 1
c    (-b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧ -p_973) -> (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0)
c  in CNF:
c     b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_2
c     b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_1
c     b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨  b^{139, 8}_0
c  in DIMACS:
 20594 -20595  20596  973 -20597 0
 20594 -20595  20596  973 -20598 0
 20594 -20595  20596  973  20599 0

c  1-1 --> 0
c    (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0 ∧ -p_973) -> (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧ -b^{139, 8}_0)
c  in CNF:
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_2
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_1
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_0
c  in DIMACS:
 20594  20595 -20596  973 -20597 0
 20594  20595 -20596  973 -20598 0
 20594  20595 -20596  973 -20599 0

c  0-1 --> -1
c    (-b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧ -p_973) -> ( b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0)
c  in CNF:
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨  b^{139, 8}_2
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_1
c     b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨  b^{139, 8}_0
c  in DIMACS:
 20594  20595  20596  973  20597 0
 20594  20595  20596  973 -20598 0
 20594  20595  20596  973  20599 0

c  -1-1 --> -2
c    ( b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧  b^{139, 7}_0 ∧ -p_973) -> ( b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0)
c  in CNF:
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨  b^{139, 8}_2
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨  b^{139, 8}_1
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨  p_973 ∨ -b^{139, 8}_0
c  in DIMACS:
-20594  20595 -20596  973  20597 0
-20594  20595 -20596  973  20598 0
-20594  20595 -20596  973 -20599 0

c  -2-1 --> break 
c    ( b^{139, 7}_2 ∧  b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧ -p_973) -> break
c  in CNF:
c    -b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨  b^{139, 7}_0 ∨  p_973 ∨ break
c  in DIMACS:
-20594 -20595  20596  973 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 7}_2 ∧ -b^{139, 7}_1 ∧ -b^{139, 7}_0 ∧ true) 
c  in CNF:
c    -b^{139, 7}_2 ∨  b^{139, 7}_1 ∨  b^{139, 7}_0 ∨ false 
c  in DIMACS:
-20594  20595  20596  0

c  3 does not represent an automaton state.
c    -(-b^{139, 7}_2 ∧  b^{139, 7}_1 ∧  b^{139, 7}_0 ∧ true) 
c  in CNF:
c     b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ false 
c  in DIMACS:
 20594 -20595 -20596  0
c  -3 does not represent an automaton state.
c    -( b^{139, 7}_2 ∧  b^{139, 7}_1 ∧  b^{139, 7}_0 ∧ true) 
c  in CNF:
c    -b^{139, 7}_2 ∨ -b^{139, 7}_1 ∨ -b^{139, 7}_0 ∨ false 
c  in DIMACS:
-20594 -20595 -20596  0

c i = 8
c  -2+1 --> -1
c    ( b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧  p_1112) -> ( b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧  b^{139, 9}_0)
c  in CNF:
c    -b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨  b^{139, 9}_2
c    -b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_1
c    -b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨  b^{139, 9}_0
c  in DIMACS:
-20597 -20598  20599 -1112  20600 0
-20597 -20598  20599 -1112 -20601 0
-20597 -20598  20599 -1112  20602 0

c  -1+1 --> 0
c    ( b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0 ∧  p_1112) -> (-b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧ -b^{139, 9}_0)
c  in CNF:
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_2
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_1
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_0
c  in DIMACS:
-20597  20598 -20599 -1112 -20600 0
-20597  20598 -20599 -1112 -20601 0
-20597  20598 -20599 -1112 -20602 0

c  0+1 --> 1
c    (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧  p_1112) -> (-b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧  b^{139, 9}_0)
c  in CNF:
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_2
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_1
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨  b^{139, 9}_0
c  in DIMACS:
 20597  20598  20599 -1112 -20600 0
 20597  20598  20599 -1112 -20601 0
 20597  20598  20599 -1112  20602 0

c  1+1 --> 2
c    (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0 ∧  p_1112) -> (-b^{139, 9}_2 ∧  b^{139, 9}_1 ∧ -b^{139, 9}_0)
c  in CNF:
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_2
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨  b^{139, 9}_1
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ -p_1112 ∨ -b^{139, 9}_0
c  in DIMACS:
 20597  20598 -20599 -1112 -20600 0
 20597  20598 -20599 -1112  20601 0
 20597  20598 -20599 -1112 -20602 0

c  2+1 --> break 
c    (-b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 20597 -20598  20599 -1112 1162 0


c  2-1 --> 1
c    (-b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧ -p_1112) -> (-b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧  b^{139, 9}_0)
c  in CNF:
c     b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_2
c     b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_1
c     b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨  b^{139, 9}_0
c  in DIMACS:
 20597 -20598  20599  1112 -20600 0
 20597 -20598  20599  1112 -20601 0
 20597 -20598  20599  1112  20602 0

c  1-1 --> 0
c    (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0 ∧ -p_1112) -> (-b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧ -b^{139, 9}_0)
c  in CNF:
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_2
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_1
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_0
c  in DIMACS:
 20597  20598 -20599  1112 -20600 0
 20597  20598 -20599  1112 -20601 0
 20597  20598 -20599  1112 -20602 0

c  0-1 --> -1
c    (-b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧ -p_1112) -> ( b^{139, 9}_2 ∧ -b^{139, 9}_1 ∧  b^{139, 9}_0)
c  in CNF:
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨  b^{139, 9}_2
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_1
c     b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨  b^{139, 9}_0
c  in DIMACS:
 20597  20598  20599  1112  20600 0
 20597  20598  20599  1112 -20601 0
 20597  20598  20599  1112  20602 0

c  -1-1 --> -2
c    ( b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧  b^{139, 8}_0 ∧ -p_1112) -> ( b^{139, 9}_2 ∧  b^{139, 9}_1 ∧ -b^{139, 9}_0)
c  in CNF:
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨  b^{139, 9}_2
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨  b^{139, 9}_1
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨  p_1112 ∨ -b^{139, 9}_0
c  in DIMACS:
-20597  20598 -20599  1112  20600 0
-20597  20598 -20599  1112  20601 0
-20597  20598 -20599  1112 -20602 0

c  -2-1 --> break 
c    ( b^{139, 8}_2 ∧  b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨  b^{139, 8}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-20597 -20598  20599  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{139, 8}_2 ∧ -b^{139, 8}_1 ∧ -b^{139, 8}_0 ∧ true) 
c  in CNF:
c    -b^{139, 8}_2 ∨  b^{139, 8}_1 ∨  b^{139, 8}_0 ∨ false 
c  in DIMACS:
-20597  20598  20599  0

c  3 does not represent an automaton state.
c    -(-b^{139, 8}_2 ∧  b^{139, 8}_1 ∧  b^{139, 8}_0 ∧ true) 
c  in CNF:
c     b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ false 
c  in DIMACS:
 20597 -20598 -20599  0
c  -3 does not represent an automaton state.
c    -( b^{139, 8}_2 ∧  b^{139, 8}_1 ∧  b^{139, 8}_0 ∧ true) 
c  in CNF:
c    -b^{139, 8}_2 ∨ -b^{139, 8}_1 ∨ -b^{139, 8}_0 ∨ false 
c  in DIMACS:
-20597 -20598 -20599  0

c INIT for k = 140
c    -b^{140, 1}_2
c    -b^{140, 1}_1
c    -b^{140, 1}_0
c  in DIMACS:
-20603 0
-20604 0
-20605 0

c Transitions for k = 140
c i = 1
c  -2+1 --> -1
c    ( b^{140, 1}_2 ∧  b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧  p_140) -> ( b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0)
c  in CNF:
c    -b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨  b^{140, 2}_2
c    -b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_1
c    -b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨  b^{140, 2}_0
c  in DIMACS:
-20603 -20604  20605 -140  20606 0
-20603 -20604  20605 -140 -20607 0
-20603 -20604  20605 -140  20608 0

c  -1+1 --> 0
c    ( b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧  b^{140, 1}_0 ∧  p_140) -> (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧ -b^{140, 2}_0)
c  in CNF:
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_2
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_1
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_0
c  in DIMACS:
-20603  20604 -20605 -140 -20606 0
-20603  20604 -20605 -140 -20607 0
-20603  20604 -20605 -140 -20608 0

c  0+1 --> 1
c    (-b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧  p_140) -> (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0)
c  in CNF:
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_2
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_1
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨  b^{140, 2}_0
c  in DIMACS:
 20603  20604  20605 -140 -20606 0
 20603  20604  20605 -140 -20607 0
 20603  20604  20605 -140  20608 0

c  1+1 --> 2
c    (-b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧  b^{140, 1}_0 ∧  p_140) -> (-b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0)
c  in CNF:
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_2
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨  b^{140, 2}_1
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ -p_140 ∨ -b^{140, 2}_0
c  in DIMACS:
 20603  20604 -20605 -140 -20606 0
 20603  20604 -20605 -140  20607 0
 20603  20604 -20605 -140 -20608 0

c  2+1 --> break 
c    (-b^{140, 1}_2 ∧  b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧  p_140) -> break
c  in CNF:
c     b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ -p_140 ∨ break
c  in DIMACS:
 20603 -20604  20605 -140 1162 0


c  2-1 --> 1
c    (-b^{140, 1}_2 ∧  b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧ -p_140) -> (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0)
c  in CNF:
c     b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_2
c     b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_1
c     b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨  b^{140, 2}_0
c  in DIMACS:
 20603 -20604  20605  140 -20606 0
 20603 -20604  20605  140 -20607 0
 20603 -20604  20605  140  20608 0

c  1-1 --> 0
c    (-b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧  b^{140, 1}_0 ∧ -p_140) -> (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧ -b^{140, 2}_0)
c  in CNF:
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_2
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_1
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_0
c  in DIMACS:
 20603  20604 -20605  140 -20606 0
 20603  20604 -20605  140 -20607 0
 20603  20604 -20605  140 -20608 0

c  0-1 --> -1
c    (-b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧ -p_140) -> ( b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0)
c  in CNF:
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨  b^{140, 2}_2
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_1
c     b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨  b^{140, 2}_0
c  in DIMACS:
 20603  20604  20605  140  20606 0
 20603  20604  20605  140 -20607 0
 20603  20604  20605  140  20608 0

c  -1-1 --> -2
c    ( b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧  b^{140, 1}_0 ∧ -p_140) -> ( b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0)
c  in CNF:
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨  b^{140, 2}_2
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨  b^{140, 2}_1
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨  p_140 ∨ -b^{140, 2}_0
c  in DIMACS:
-20603  20604 -20605  140  20606 0
-20603  20604 -20605  140  20607 0
-20603  20604 -20605  140 -20608 0

c  -2-1 --> break 
c    ( b^{140, 1}_2 ∧  b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧ -p_140) -> break
c  in CNF:
c    -b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨  b^{140, 1}_0 ∨  p_140 ∨ break
c  in DIMACS:
-20603 -20604  20605  140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 1}_2 ∧ -b^{140, 1}_1 ∧ -b^{140, 1}_0 ∧ true) 
c  in CNF:
c    -b^{140, 1}_2 ∨  b^{140, 1}_1 ∨  b^{140, 1}_0 ∨ false 
c  in DIMACS:
-20603  20604  20605  0

c  3 does not represent an automaton state.
c    -(-b^{140, 1}_2 ∧  b^{140, 1}_1 ∧  b^{140, 1}_0 ∧ true) 
c  in CNF:
c     b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ false 
c  in DIMACS:
 20603 -20604 -20605  0
c  -3 does not represent an automaton state.
c    -( b^{140, 1}_2 ∧  b^{140, 1}_1 ∧  b^{140, 1}_0 ∧ true) 
c  in CNF:
c    -b^{140, 1}_2 ∨ -b^{140, 1}_1 ∨ -b^{140, 1}_0 ∨ false 
c  in DIMACS:
-20603 -20604 -20605  0

c i = 2
c  -2+1 --> -1
c    ( b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧  p_280) -> ( b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0)
c  in CNF:
c    -b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨  b^{140, 3}_2
c    -b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_1
c    -b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨  b^{140, 3}_0
c  in DIMACS:
-20606 -20607  20608 -280  20609 0
-20606 -20607  20608 -280 -20610 0
-20606 -20607  20608 -280  20611 0

c  -1+1 --> 0
c    ( b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0 ∧  p_280) -> (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧ -b^{140, 3}_0)
c  in CNF:
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_2
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_1
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_0
c  in DIMACS:
-20606  20607 -20608 -280 -20609 0
-20606  20607 -20608 -280 -20610 0
-20606  20607 -20608 -280 -20611 0

c  0+1 --> 1
c    (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧  p_280) -> (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0)
c  in CNF:
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_2
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_1
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨  b^{140, 3}_0
c  in DIMACS:
 20606  20607  20608 -280 -20609 0
 20606  20607  20608 -280 -20610 0
 20606  20607  20608 -280  20611 0

c  1+1 --> 2
c    (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0 ∧  p_280) -> (-b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0)
c  in CNF:
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_2
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨  b^{140, 3}_1
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ -p_280 ∨ -b^{140, 3}_0
c  in DIMACS:
 20606  20607 -20608 -280 -20609 0
 20606  20607 -20608 -280  20610 0
 20606  20607 -20608 -280 -20611 0

c  2+1 --> break 
c    (-b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧  p_280) -> break
c  in CNF:
c     b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 20606 -20607  20608 -280 1162 0


c  2-1 --> 1
c    (-b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧ -p_280) -> (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0)
c  in CNF:
c     b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_2
c     b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_1
c     b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨  b^{140, 3}_0
c  in DIMACS:
 20606 -20607  20608  280 -20609 0
 20606 -20607  20608  280 -20610 0
 20606 -20607  20608  280  20611 0

c  1-1 --> 0
c    (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0 ∧ -p_280) -> (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧ -b^{140, 3}_0)
c  in CNF:
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_2
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_1
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_0
c  in DIMACS:
 20606  20607 -20608  280 -20609 0
 20606  20607 -20608  280 -20610 0
 20606  20607 -20608  280 -20611 0

c  0-1 --> -1
c    (-b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧ -p_280) -> ( b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0)
c  in CNF:
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨  b^{140, 3}_2
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_1
c     b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨  b^{140, 3}_0
c  in DIMACS:
 20606  20607  20608  280  20609 0
 20606  20607  20608  280 -20610 0
 20606  20607  20608  280  20611 0

c  -1-1 --> -2
c    ( b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧  b^{140, 2}_0 ∧ -p_280) -> ( b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0)
c  in CNF:
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨  b^{140, 3}_2
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨  b^{140, 3}_1
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨  p_280 ∨ -b^{140, 3}_0
c  in DIMACS:
-20606  20607 -20608  280  20609 0
-20606  20607 -20608  280  20610 0
-20606  20607 -20608  280 -20611 0

c  -2-1 --> break 
c    ( b^{140, 2}_2 ∧  b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨  b^{140, 2}_0 ∨  p_280 ∨ break
c  in DIMACS:
-20606 -20607  20608  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 2}_2 ∧ -b^{140, 2}_1 ∧ -b^{140, 2}_0 ∧ true) 
c  in CNF:
c    -b^{140, 2}_2 ∨  b^{140, 2}_1 ∨  b^{140, 2}_0 ∨ false 
c  in DIMACS:
-20606  20607  20608  0

c  3 does not represent an automaton state.
c    -(-b^{140, 2}_2 ∧  b^{140, 2}_1 ∧  b^{140, 2}_0 ∧ true) 
c  in CNF:
c     b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ false 
c  in DIMACS:
 20606 -20607 -20608  0
c  -3 does not represent an automaton state.
c    -( b^{140, 2}_2 ∧  b^{140, 2}_1 ∧  b^{140, 2}_0 ∧ true) 
c  in CNF:
c    -b^{140, 2}_2 ∨ -b^{140, 2}_1 ∨ -b^{140, 2}_0 ∨ false 
c  in DIMACS:
-20606 -20607 -20608  0

c i = 3
c  -2+1 --> -1
c    ( b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧  p_420) -> ( b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0)
c  in CNF:
c    -b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨  b^{140, 4}_2
c    -b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_1
c    -b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨  b^{140, 4}_0
c  in DIMACS:
-20609 -20610  20611 -420  20612 0
-20609 -20610  20611 -420 -20613 0
-20609 -20610  20611 -420  20614 0

c  -1+1 --> 0
c    ( b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0 ∧  p_420) -> (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧ -b^{140, 4}_0)
c  in CNF:
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_2
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_1
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_0
c  in DIMACS:
-20609  20610 -20611 -420 -20612 0
-20609  20610 -20611 -420 -20613 0
-20609  20610 -20611 -420 -20614 0

c  0+1 --> 1
c    (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧  p_420) -> (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0)
c  in CNF:
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_2
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_1
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨  b^{140, 4}_0
c  in DIMACS:
 20609  20610  20611 -420 -20612 0
 20609  20610  20611 -420 -20613 0
 20609  20610  20611 -420  20614 0

c  1+1 --> 2
c    (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0 ∧  p_420) -> (-b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0)
c  in CNF:
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_2
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨  b^{140, 4}_1
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ -p_420 ∨ -b^{140, 4}_0
c  in DIMACS:
 20609  20610 -20611 -420 -20612 0
 20609  20610 -20611 -420  20613 0
 20609  20610 -20611 -420 -20614 0

c  2+1 --> break 
c    (-b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧  p_420) -> break
c  in CNF:
c     b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 20609 -20610  20611 -420 1162 0


c  2-1 --> 1
c    (-b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧ -p_420) -> (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0)
c  in CNF:
c     b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_2
c     b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_1
c     b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨  b^{140, 4}_0
c  in DIMACS:
 20609 -20610  20611  420 -20612 0
 20609 -20610  20611  420 -20613 0
 20609 -20610  20611  420  20614 0

c  1-1 --> 0
c    (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0 ∧ -p_420) -> (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧ -b^{140, 4}_0)
c  in CNF:
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_2
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_1
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_0
c  in DIMACS:
 20609  20610 -20611  420 -20612 0
 20609  20610 -20611  420 -20613 0
 20609  20610 -20611  420 -20614 0

c  0-1 --> -1
c    (-b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧ -p_420) -> ( b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0)
c  in CNF:
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨  b^{140, 4}_2
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_1
c     b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨  b^{140, 4}_0
c  in DIMACS:
 20609  20610  20611  420  20612 0
 20609  20610  20611  420 -20613 0
 20609  20610  20611  420  20614 0

c  -1-1 --> -2
c    ( b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧  b^{140, 3}_0 ∧ -p_420) -> ( b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0)
c  in CNF:
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨  b^{140, 4}_2
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨  b^{140, 4}_1
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨  p_420 ∨ -b^{140, 4}_0
c  in DIMACS:
-20609  20610 -20611  420  20612 0
-20609  20610 -20611  420  20613 0
-20609  20610 -20611  420 -20614 0

c  -2-1 --> break 
c    ( b^{140, 3}_2 ∧  b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨  b^{140, 3}_0 ∨  p_420 ∨ break
c  in DIMACS:
-20609 -20610  20611  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 3}_2 ∧ -b^{140, 3}_1 ∧ -b^{140, 3}_0 ∧ true) 
c  in CNF:
c    -b^{140, 3}_2 ∨  b^{140, 3}_1 ∨  b^{140, 3}_0 ∨ false 
c  in DIMACS:
-20609  20610  20611  0

c  3 does not represent an automaton state.
c    -(-b^{140, 3}_2 ∧  b^{140, 3}_1 ∧  b^{140, 3}_0 ∧ true) 
c  in CNF:
c     b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ false 
c  in DIMACS:
 20609 -20610 -20611  0
c  -3 does not represent an automaton state.
c    -( b^{140, 3}_2 ∧  b^{140, 3}_1 ∧  b^{140, 3}_0 ∧ true) 
c  in CNF:
c    -b^{140, 3}_2 ∨ -b^{140, 3}_1 ∨ -b^{140, 3}_0 ∨ false 
c  in DIMACS:
-20609 -20610 -20611  0

c i = 4
c  -2+1 --> -1
c    ( b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧  p_560) -> ( b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0)
c  in CNF:
c    -b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨  b^{140, 5}_2
c    -b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_1
c    -b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨  b^{140, 5}_0
c  in DIMACS:
-20612 -20613  20614 -560  20615 0
-20612 -20613  20614 -560 -20616 0
-20612 -20613  20614 -560  20617 0

c  -1+1 --> 0
c    ( b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0 ∧  p_560) -> (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧ -b^{140, 5}_0)
c  in CNF:
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_2
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_1
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_0
c  in DIMACS:
-20612  20613 -20614 -560 -20615 0
-20612  20613 -20614 -560 -20616 0
-20612  20613 -20614 -560 -20617 0

c  0+1 --> 1
c    (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧  p_560) -> (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0)
c  in CNF:
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_2
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_1
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨  b^{140, 5}_0
c  in DIMACS:
 20612  20613  20614 -560 -20615 0
 20612  20613  20614 -560 -20616 0
 20612  20613  20614 -560  20617 0

c  1+1 --> 2
c    (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0 ∧  p_560) -> (-b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0)
c  in CNF:
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_2
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨  b^{140, 5}_1
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ -p_560 ∨ -b^{140, 5}_0
c  in DIMACS:
 20612  20613 -20614 -560 -20615 0
 20612  20613 -20614 -560  20616 0
 20612  20613 -20614 -560 -20617 0

c  2+1 --> break 
c    (-b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧  p_560) -> break
c  in CNF:
c     b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 20612 -20613  20614 -560 1162 0


c  2-1 --> 1
c    (-b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧ -p_560) -> (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0)
c  in CNF:
c     b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_2
c     b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_1
c     b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨  b^{140, 5}_0
c  in DIMACS:
 20612 -20613  20614  560 -20615 0
 20612 -20613  20614  560 -20616 0
 20612 -20613  20614  560  20617 0

c  1-1 --> 0
c    (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0 ∧ -p_560) -> (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧ -b^{140, 5}_0)
c  in CNF:
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_2
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_1
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_0
c  in DIMACS:
 20612  20613 -20614  560 -20615 0
 20612  20613 -20614  560 -20616 0
 20612  20613 -20614  560 -20617 0

c  0-1 --> -1
c    (-b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧ -p_560) -> ( b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0)
c  in CNF:
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨  b^{140, 5}_2
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_1
c     b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨  b^{140, 5}_0
c  in DIMACS:
 20612  20613  20614  560  20615 0
 20612  20613  20614  560 -20616 0
 20612  20613  20614  560  20617 0

c  -1-1 --> -2
c    ( b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧  b^{140, 4}_0 ∧ -p_560) -> ( b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0)
c  in CNF:
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨  b^{140, 5}_2
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨  b^{140, 5}_1
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨  p_560 ∨ -b^{140, 5}_0
c  in DIMACS:
-20612  20613 -20614  560  20615 0
-20612  20613 -20614  560  20616 0
-20612  20613 -20614  560 -20617 0

c  -2-1 --> break 
c    ( b^{140, 4}_2 ∧  b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨  b^{140, 4}_0 ∨  p_560 ∨ break
c  in DIMACS:
-20612 -20613  20614  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 4}_2 ∧ -b^{140, 4}_1 ∧ -b^{140, 4}_0 ∧ true) 
c  in CNF:
c    -b^{140, 4}_2 ∨  b^{140, 4}_1 ∨  b^{140, 4}_0 ∨ false 
c  in DIMACS:
-20612  20613  20614  0

c  3 does not represent an automaton state.
c    -(-b^{140, 4}_2 ∧  b^{140, 4}_1 ∧  b^{140, 4}_0 ∧ true) 
c  in CNF:
c     b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ false 
c  in DIMACS:
 20612 -20613 -20614  0
c  -3 does not represent an automaton state.
c    -( b^{140, 4}_2 ∧  b^{140, 4}_1 ∧  b^{140, 4}_0 ∧ true) 
c  in CNF:
c    -b^{140, 4}_2 ∨ -b^{140, 4}_1 ∨ -b^{140, 4}_0 ∨ false 
c  in DIMACS:
-20612 -20613 -20614  0

c i = 5
c  -2+1 --> -1
c    ( b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧  p_700) -> ( b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0)
c  in CNF:
c    -b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨  b^{140, 6}_2
c    -b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_1
c    -b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨  b^{140, 6}_0
c  in DIMACS:
-20615 -20616  20617 -700  20618 0
-20615 -20616  20617 -700 -20619 0
-20615 -20616  20617 -700  20620 0

c  -1+1 --> 0
c    ( b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0 ∧  p_700) -> (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧ -b^{140, 6}_0)
c  in CNF:
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_2
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_1
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_0
c  in DIMACS:
-20615  20616 -20617 -700 -20618 0
-20615  20616 -20617 -700 -20619 0
-20615  20616 -20617 -700 -20620 0

c  0+1 --> 1
c    (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧  p_700) -> (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0)
c  in CNF:
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_2
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_1
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨  b^{140, 6}_0
c  in DIMACS:
 20615  20616  20617 -700 -20618 0
 20615  20616  20617 -700 -20619 0
 20615  20616  20617 -700  20620 0

c  1+1 --> 2
c    (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0 ∧  p_700) -> (-b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0)
c  in CNF:
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_2
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨  b^{140, 6}_1
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ -p_700 ∨ -b^{140, 6}_0
c  in DIMACS:
 20615  20616 -20617 -700 -20618 0
 20615  20616 -20617 -700  20619 0
 20615  20616 -20617 -700 -20620 0

c  2+1 --> break 
c    (-b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧  p_700) -> break
c  in CNF:
c     b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 20615 -20616  20617 -700 1162 0


c  2-1 --> 1
c    (-b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧ -p_700) -> (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0)
c  in CNF:
c     b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_2
c     b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_1
c     b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨  b^{140, 6}_0
c  in DIMACS:
 20615 -20616  20617  700 -20618 0
 20615 -20616  20617  700 -20619 0
 20615 -20616  20617  700  20620 0

c  1-1 --> 0
c    (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0 ∧ -p_700) -> (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧ -b^{140, 6}_0)
c  in CNF:
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_2
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_1
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_0
c  in DIMACS:
 20615  20616 -20617  700 -20618 0
 20615  20616 -20617  700 -20619 0
 20615  20616 -20617  700 -20620 0

c  0-1 --> -1
c    (-b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧ -p_700) -> ( b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0)
c  in CNF:
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨  b^{140, 6}_2
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_1
c     b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨  b^{140, 6}_0
c  in DIMACS:
 20615  20616  20617  700  20618 0
 20615  20616  20617  700 -20619 0
 20615  20616  20617  700  20620 0

c  -1-1 --> -2
c    ( b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧  b^{140, 5}_0 ∧ -p_700) -> ( b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0)
c  in CNF:
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨  b^{140, 6}_2
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨  b^{140, 6}_1
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨  p_700 ∨ -b^{140, 6}_0
c  in DIMACS:
-20615  20616 -20617  700  20618 0
-20615  20616 -20617  700  20619 0
-20615  20616 -20617  700 -20620 0

c  -2-1 --> break 
c    ( b^{140, 5}_2 ∧  b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨  b^{140, 5}_0 ∨  p_700 ∨ break
c  in DIMACS:
-20615 -20616  20617  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 5}_2 ∧ -b^{140, 5}_1 ∧ -b^{140, 5}_0 ∧ true) 
c  in CNF:
c    -b^{140, 5}_2 ∨  b^{140, 5}_1 ∨  b^{140, 5}_0 ∨ false 
c  in DIMACS:
-20615  20616  20617  0

c  3 does not represent an automaton state.
c    -(-b^{140, 5}_2 ∧  b^{140, 5}_1 ∧  b^{140, 5}_0 ∧ true) 
c  in CNF:
c     b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ false 
c  in DIMACS:
 20615 -20616 -20617  0
c  -3 does not represent an automaton state.
c    -( b^{140, 5}_2 ∧  b^{140, 5}_1 ∧  b^{140, 5}_0 ∧ true) 
c  in CNF:
c    -b^{140, 5}_2 ∨ -b^{140, 5}_1 ∨ -b^{140, 5}_0 ∨ false 
c  in DIMACS:
-20615 -20616 -20617  0

c i = 6
c  -2+1 --> -1
c    ( b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧  p_840) -> ( b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0)
c  in CNF:
c    -b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨  b^{140, 7}_2
c    -b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_1
c    -b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨  b^{140, 7}_0
c  in DIMACS:
-20618 -20619  20620 -840  20621 0
-20618 -20619  20620 -840 -20622 0
-20618 -20619  20620 -840  20623 0

c  -1+1 --> 0
c    ( b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0 ∧  p_840) -> (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧ -b^{140, 7}_0)
c  in CNF:
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_2
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_1
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_0
c  in DIMACS:
-20618  20619 -20620 -840 -20621 0
-20618  20619 -20620 -840 -20622 0
-20618  20619 -20620 -840 -20623 0

c  0+1 --> 1
c    (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧  p_840) -> (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0)
c  in CNF:
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_2
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_1
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨  b^{140, 7}_0
c  in DIMACS:
 20618  20619  20620 -840 -20621 0
 20618  20619  20620 -840 -20622 0
 20618  20619  20620 -840  20623 0

c  1+1 --> 2
c    (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0 ∧  p_840) -> (-b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0)
c  in CNF:
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_2
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨  b^{140, 7}_1
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ -p_840 ∨ -b^{140, 7}_0
c  in DIMACS:
 20618  20619 -20620 -840 -20621 0
 20618  20619 -20620 -840  20622 0
 20618  20619 -20620 -840 -20623 0

c  2+1 --> break 
c    (-b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧  p_840) -> break
c  in CNF:
c     b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 20618 -20619  20620 -840 1162 0


c  2-1 --> 1
c    (-b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧ -p_840) -> (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0)
c  in CNF:
c     b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_2
c     b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_1
c     b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨  b^{140, 7}_0
c  in DIMACS:
 20618 -20619  20620  840 -20621 0
 20618 -20619  20620  840 -20622 0
 20618 -20619  20620  840  20623 0

c  1-1 --> 0
c    (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0 ∧ -p_840) -> (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧ -b^{140, 7}_0)
c  in CNF:
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_2
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_1
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_0
c  in DIMACS:
 20618  20619 -20620  840 -20621 0
 20618  20619 -20620  840 -20622 0
 20618  20619 -20620  840 -20623 0

c  0-1 --> -1
c    (-b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧ -p_840) -> ( b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0)
c  in CNF:
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨  b^{140, 7}_2
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_1
c     b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨  b^{140, 7}_0
c  in DIMACS:
 20618  20619  20620  840  20621 0
 20618  20619  20620  840 -20622 0
 20618  20619  20620  840  20623 0

c  -1-1 --> -2
c    ( b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧  b^{140, 6}_0 ∧ -p_840) -> ( b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0)
c  in CNF:
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨  b^{140, 7}_2
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨  b^{140, 7}_1
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨  p_840 ∨ -b^{140, 7}_0
c  in DIMACS:
-20618  20619 -20620  840  20621 0
-20618  20619 -20620  840  20622 0
-20618  20619 -20620  840 -20623 0

c  -2-1 --> break 
c    ( b^{140, 6}_2 ∧  b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨  b^{140, 6}_0 ∨  p_840 ∨ break
c  in DIMACS:
-20618 -20619  20620  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 6}_2 ∧ -b^{140, 6}_1 ∧ -b^{140, 6}_0 ∧ true) 
c  in CNF:
c    -b^{140, 6}_2 ∨  b^{140, 6}_1 ∨  b^{140, 6}_0 ∨ false 
c  in DIMACS:
-20618  20619  20620  0

c  3 does not represent an automaton state.
c    -(-b^{140, 6}_2 ∧  b^{140, 6}_1 ∧  b^{140, 6}_0 ∧ true) 
c  in CNF:
c     b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ false 
c  in DIMACS:
 20618 -20619 -20620  0
c  -3 does not represent an automaton state.
c    -( b^{140, 6}_2 ∧  b^{140, 6}_1 ∧  b^{140, 6}_0 ∧ true) 
c  in CNF:
c    -b^{140, 6}_2 ∨ -b^{140, 6}_1 ∨ -b^{140, 6}_0 ∨ false 
c  in DIMACS:
-20618 -20619 -20620  0

c i = 7
c  -2+1 --> -1
c    ( b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧  p_980) -> ( b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0)
c  in CNF:
c    -b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨  b^{140, 8}_2
c    -b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_1
c    -b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨  b^{140, 8}_0
c  in DIMACS:
-20621 -20622  20623 -980  20624 0
-20621 -20622  20623 -980 -20625 0
-20621 -20622  20623 -980  20626 0

c  -1+1 --> 0
c    ( b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0 ∧  p_980) -> (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧ -b^{140, 8}_0)
c  in CNF:
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_2
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_1
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_0
c  in DIMACS:
-20621  20622 -20623 -980 -20624 0
-20621  20622 -20623 -980 -20625 0
-20621  20622 -20623 -980 -20626 0

c  0+1 --> 1
c    (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧  p_980) -> (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0)
c  in CNF:
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_2
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_1
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨  b^{140, 8}_0
c  in DIMACS:
 20621  20622  20623 -980 -20624 0
 20621  20622  20623 -980 -20625 0
 20621  20622  20623 -980  20626 0

c  1+1 --> 2
c    (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0 ∧  p_980) -> (-b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0)
c  in CNF:
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_2
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨  b^{140, 8}_1
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ -p_980 ∨ -b^{140, 8}_0
c  in DIMACS:
 20621  20622 -20623 -980 -20624 0
 20621  20622 -20623 -980  20625 0
 20621  20622 -20623 -980 -20626 0

c  2+1 --> break 
c    (-b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧  p_980) -> break
c  in CNF:
c     b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 20621 -20622  20623 -980 1162 0


c  2-1 --> 1
c    (-b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧ -p_980) -> (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0)
c  in CNF:
c     b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_2
c     b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_1
c     b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨  b^{140, 8}_0
c  in DIMACS:
 20621 -20622  20623  980 -20624 0
 20621 -20622  20623  980 -20625 0
 20621 -20622  20623  980  20626 0

c  1-1 --> 0
c    (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0 ∧ -p_980) -> (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧ -b^{140, 8}_0)
c  in CNF:
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_2
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_1
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_0
c  in DIMACS:
 20621  20622 -20623  980 -20624 0
 20621  20622 -20623  980 -20625 0
 20621  20622 -20623  980 -20626 0

c  0-1 --> -1
c    (-b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧ -p_980) -> ( b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0)
c  in CNF:
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨  b^{140, 8}_2
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_1
c     b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨  b^{140, 8}_0
c  in DIMACS:
 20621  20622  20623  980  20624 0
 20621  20622  20623  980 -20625 0
 20621  20622  20623  980  20626 0

c  -1-1 --> -2
c    ( b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧  b^{140, 7}_0 ∧ -p_980) -> ( b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0)
c  in CNF:
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨  b^{140, 8}_2
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨  b^{140, 8}_1
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨  p_980 ∨ -b^{140, 8}_0
c  in DIMACS:
-20621  20622 -20623  980  20624 0
-20621  20622 -20623  980  20625 0
-20621  20622 -20623  980 -20626 0

c  -2-1 --> break 
c    ( b^{140, 7}_2 ∧  b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨  b^{140, 7}_0 ∨  p_980 ∨ break
c  in DIMACS:
-20621 -20622  20623  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 7}_2 ∧ -b^{140, 7}_1 ∧ -b^{140, 7}_0 ∧ true) 
c  in CNF:
c    -b^{140, 7}_2 ∨  b^{140, 7}_1 ∨  b^{140, 7}_0 ∨ false 
c  in DIMACS:
-20621  20622  20623  0

c  3 does not represent an automaton state.
c    -(-b^{140, 7}_2 ∧  b^{140, 7}_1 ∧  b^{140, 7}_0 ∧ true) 
c  in CNF:
c     b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ false 
c  in DIMACS:
 20621 -20622 -20623  0
c  -3 does not represent an automaton state.
c    -( b^{140, 7}_2 ∧  b^{140, 7}_1 ∧  b^{140, 7}_0 ∧ true) 
c  in CNF:
c    -b^{140, 7}_2 ∨ -b^{140, 7}_1 ∨ -b^{140, 7}_0 ∨ false 
c  in DIMACS:
-20621 -20622 -20623  0

c i = 8
c  -2+1 --> -1
c    ( b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧  p_1120) -> ( b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧  b^{140, 9}_0)
c  in CNF:
c    -b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨  b^{140, 9}_2
c    -b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_1
c    -b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨  b^{140, 9}_0
c  in DIMACS:
-20624 -20625  20626 -1120  20627 0
-20624 -20625  20626 -1120 -20628 0
-20624 -20625  20626 -1120  20629 0

c  -1+1 --> 0
c    ( b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0 ∧  p_1120) -> (-b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧ -b^{140, 9}_0)
c  in CNF:
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_2
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_1
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_0
c  in DIMACS:
-20624  20625 -20626 -1120 -20627 0
-20624  20625 -20626 -1120 -20628 0
-20624  20625 -20626 -1120 -20629 0

c  0+1 --> 1
c    (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧  p_1120) -> (-b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧  b^{140, 9}_0)
c  in CNF:
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_2
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_1
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨  b^{140, 9}_0
c  in DIMACS:
 20624  20625  20626 -1120 -20627 0
 20624  20625  20626 -1120 -20628 0
 20624  20625  20626 -1120  20629 0

c  1+1 --> 2
c    (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0 ∧  p_1120) -> (-b^{140, 9}_2 ∧  b^{140, 9}_1 ∧ -b^{140, 9}_0)
c  in CNF:
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_2
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨  b^{140, 9}_1
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ -p_1120 ∨ -b^{140, 9}_0
c  in DIMACS:
 20624  20625 -20626 -1120 -20627 0
 20624  20625 -20626 -1120  20628 0
 20624  20625 -20626 -1120 -20629 0

c  2+1 --> break 
c    (-b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 20624 -20625  20626 -1120 1162 0


c  2-1 --> 1
c    (-b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧ -p_1120) -> (-b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧  b^{140, 9}_0)
c  in CNF:
c     b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_2
c     b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_1
c     b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨  b^{140, 9}_0
c  in DIMACS:
 20624 -20625  20626  1120 -20627 0
 20624 -20625  20626  1120 -20628 0
 20624 -20625  20626  1120  20629 0

c  1-1 --> 0
c    (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0 ∧ -p_1120) -> (-b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧ -b^{140, 9}_0)
c  in CNF:
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_2
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_1
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_0
c  in DIMACS:
 20624  20625 -20626  1120 -20627 0
 20624  20625 -20626  1120 -20628 0
 20624  20625 -20626  1120 -20629 0

c  0-1 --> -1
c    (-b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧ -p_1120) -> ( b^{140, 9}_2 ∧ -b^{140, 9}_1 ∧  b^{140, 9}_0)
c  in CNF:
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨  b^{140, 9}_2
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_1
c     b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨  b^{140, 9}_0
c  in DIMACS:
 20624  20625  20626  1120  20627 0
 20624  20625  20626  1120 -20628 0
 20624  20625  20626  1120  20629 0

c  -1-1 --> -2
c    ( b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧  b^{140, 8}_0 ∧ -p_1120) -> ( b^{140, 9}_2 ∧  b^{140, 9}_1 ∧ -b^{140, 9}_0)
c  in CNF:
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨  b^{140, 9}_2
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨  b^{140, 9}_1
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨  p_1120 ∨ -b^{140, 9}_0
c  in DIMACS:
-20624  20625 -20626  1120  20627 0
-20624  20625 -20626  1120  20628 0
-20624  20625 -20626  1120 -20629 0

c  -2-1 --> break 
c    ( b^{140, 8}_2 ∧  b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨  b^{140, 8}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-20624 -20625  20626  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{140, 8}_2 ∧ -b^{140, 8}_1 ∧ -b^{140, 8}_0 ∧ true) 
c  in CNF:
c    -b^{140, 8}_2 ∨  b^{140, 8}_1 ∨  b^{140, 8}_0 ∨ false 
c  in DIMACS:
-20624  20625  20626  0

c  3 does not represent an automaton state.
c    -(-b^{140, 8}_2 ∧  b^{140, 8}_1 ∧  b^{140, 8}_0 ∧ true) 
c  in CNF:
c     b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ false 
c  in DIMACS:
 20624 -20625 -20626  0
c  -3 does not represent an automaton state.
c    -( b^{140, 8}_2 ∧  b^{140, 8}_1 ∧  b^{140, 8}_0 ∧ true) 
c  in CNF:
c    -b^{140, 8}_2 ∨ -b^{140, 8}_1 ∨ -b^{140, 8}_0 ∨ false 
c  in DIMACS:
-20624 -20625 -20626  0

c INIT for k = 141
c    -b^{141, 1}_2
c    -b^{141, 1}_1
c    -b^{141, 1}_0
c  in DIMACS:
-20630 0
-20631 0
-20632 0

c Transitions for k = 141
c i = 1
c  -2+1 --> -1
c    ( b^{141, 1}_2 ∧  b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧  p_141) -> ( b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0)
c  in CNF:
c    -b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨  b^{141, 2}_2
c    -b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_1
c    -b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨  b^{141, 2}_0
c  in DIMACS:
-20630 -20631  20632 -141  20633 0
-20630 -20631  20632 -141 -20634 0
-20630 -20631  20632 -141  20635 0

c  -1+1 --> 0
c    ( b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧  b^{141, 1}_0 ∧  p_141) -> (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧ -b^{141, 2}_0)
c  in CNF:
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_2
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_1
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_0
c  in DIMACS:
-20630  20631 -20632 -141 -20633 0
-20630  20631 -20632 -141 -20634 0
-20630  20631 -20632 -141 -20635 0

c  0+1 --> 1
c    (-b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧  p_141) -> (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0)
c  in CNF:
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_2
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_1
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨  b^{141, 2}_0
c  in DIMACS:
 20630  20631  20632 -141 -20633 0
 20630  20631  20632 -141 -20634 0
 20630  20631  20632 -141  20635 0

c  1+1 --> 2
c    (-b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧  b^{141, 1}_0 ∧  p_141) -> (-b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0)
c  in CNF:
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_2
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨  b^{141, 2}_1
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ -p_141 ∨ -b^{141, 2}_0
c  in DIMACS:
 20630  20631 -20632 -141 -20633 0
 20630  20631 -20632 -141  20634 0
 20630  20631 -20632 -141 -20635 0

c  2+1 --> break 
c    (-b^{141, 1}_2 ∧  b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧  p_141) -> break
c  in CNF:
c     b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ -p_141 ∨ break
c  in DIMACS:
 20630 -20631  20632 -141 1162 0


c  2-1 --> 1
c    (-b^{141, 1}_2 ∧  b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧ -p_141) -> (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0)
c  in CNF:
c     b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_2
c     b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_1
c     b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨  b^{141, 2}_0
c  in DIMACS:
 20630 -20631  20632  141 -20633 0
 20630 -20631  20632  141 -20634 0
 20630 -20631  20632  141  20635 0

c  1-1 --> 0
c    (-b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧  b^{141, 1}_0 ∧ -p_141) -> (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧ -b^{141, 2}_0)
c  in CNF:
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_2
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_1
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_0
c  in DIMACS:
 20630  20631 -20632  141 -20633 0
 20630  20631 -20632  141 -20634 0
 20630  20631 -20632  141 -20635 0

c  0-1 --> -1
c    (-b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧ -p_141) -> ( b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0)
c  in CNF:
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨  b^{141, 2}_2
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_1
c     b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨  b^{141, 2}_0
c  in DIMACS:
 20630  20631  20632  141  20633 0
 20630  20631  20632  141 -20634 0
 20630  20631  20632  141  20635 0

c  -1-1 --> -2
c    ( b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧  b^{141, 1}_0 ∧ -p_141) -> ( b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0)
c  in CNF:
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨  b^{141, 2}_2
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨  b^{141, 2}_1
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨  p_141 ∨ -b^{141, 2}_0
c  in DIMACS:
-20630  20631 -20632  141  20633 0
-20630  20631 -20632  141  20634 0
-20630  20631 -20632  141 -20635 0

c  -2-1 --> break 
c    ( b^{141, 1}_2 ∧  b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧ -p_141) -> break
c  in CNF:
c    -b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨  b^{141, 1}_0 ∨  p_141 ∨ break
c  in DIMACS:
-20630 -20631  20632  141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 1}_2 ∧ -b^{141, 1}_1 ∧ -b^{141, 1}_0 ∧ true) 
c  in CNF:
c    -b^{141, 1}_2 ∨  b^{141, 1}_1 ∨  b^{141, 1}_0 ∨ false 
c  in DIMACS:
-20630  20631  20632  0

c  3 does not represent an automaton state.
c    -(-b^{141, 1}_2 ∧  b^{141, 1}_1 ∧  b^{141, 1}_0 ∧ true) 
c  in CNF:
c     b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ false 
c  in DIMACS:
 20630 -20631 -20632  0
c  -3 does not represent an automaton state.
c    -( b^{141, 1}_2 ∧  b^{141, 1}_1 ∧  b^{141, 1}_0 ∧ true) 
c  in CNF:
c    -b^{141, 1}_2 ∨ -b^{141, 1}_1 ∨ -b^{141, 1}_0 ∨ false 
c  in DIMACS:
-20630 -20631 -20632  0

c i = 2
c  -2+1 --> -1
c    ( b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧  p_282) -> ( b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0)
c  in CNF:
c    -b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨  b^{141, 3}_2
c    -b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_1
c    -b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨  b^{141, 3}_0
c  in DIMACS:
-20633 -20634  20635 -282  20636 0
-20633 -20634  20635 -282 -20637 0
-20633 -20634  20635 -282  20638 0

c  -1+1 --> 0
c    ( b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0 ∧  p_282) -> (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧ -b^{141, 3}_0)
c  in CNF:
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_2
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_1
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_0
c  in DIMACS:
-20633  20634 -20635 -282 -20636 0
-20633  20634 -20635 -282 -20637 0
-20633  20634 -20635 -282 -20638 0

c  0+1 --> 1
c    (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧  p_282) -> (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0)
c  in CNF:
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_2
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_1
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨  b^{141, 3}_0
c  in DIMACS:
 20633  20634  20635 -282 -20636 0
 20633  20634  20635 -282 -20637 0
 20633  20634  20635 -282  20638 0

c  1+1 --> 2
c    (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0 ∧  p_282) -> (-b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0)
c  in CNF:
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_2
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨  b^{141, 3}_1
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ -p_282 ∨ -b^{141, 3}_0
c  in DIMACS:
 20633  20634 -20635 -282 -20636 0
 20633  20634 -20635 -282  20637 0
 20633  20634 -20635 -282 -20638 0

c  2+1 --> break 
c    (-b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧  p_282) -> break
c  in CNF:
c     b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 20633 -20634  20635 -282 1162 0


c  2-1 --> 1
c    (-b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧ -p_282) -> (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0)
c  in CNF:
c     b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_2
c     b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_1
c     b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨  b^{141, 3}_0
c  in DIMACS:
 20633 -20634  20635  282 -20636 0
 20633 -20634  20635  282 -20637 0
 20633 -20634  20635  282  20638 0

c  1-1 --> 0
c    (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0 ∧ -p_282) -> (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧ -b^{141, 3}_0)
c  in CNF:
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_2
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_1
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_0
c  in DIMACS:
 20633  20634 -20635  282 -20636 0
 20633  20634 -20635  282 -20637 0
 20633  20634 -20635  282 -20638 0

c  0-1 --> -1
c    (-b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧ -p_282) -> ( b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0)
c  in CNF:
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨  b^{141, 3}_2
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_1
c     b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨  b^{141, 3}_0
c  in DIMACS:
 20633  20634  20635  282  20636 0
 20633  20634  20635  282 -20637 0
 20633  20634  20635  282  20638 0

c  -1-1 --> -2
c    ( b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧  b^{141, 2}_0 ∧ -p_282) -> ( b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0)
c  in CNF:
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨  b^{141, 3}_2
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨  b^{141, 3}_1
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨  p_282 ∨ -b^{141, 3}_0
c  in DIMACS:
-20633  20634 -20635  282  20636 0
-20633  20634 -20635  282  20637 0
-20633  20634 -20635  282 -20638 0

c  -2-1 --> break 
c    ( b^{141, 2}_2 ∧  b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨  b^{141, 2}_0 ∨  p_282 ∨ break
c  in DIMACS:
-20633 -20634  20635  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 2}_2 ∧ -b^{141, 2}_1 ∧ -b^{141, 2}_0 ∧ true) 
c  in CNF:
c    -b^{141, 2}_2 ∨  b^{141, 2}_1 ∨  b^{141, 2}_0 ∨ false 
c  in DIMACS:
-20633  20634  20635  0

c  3 does not represent an automaton state.
c    -(-b^{141, 2}_2 ∧  b^{141, 2}_1 ∧  b^{141, 2}_0 ∧ true) 
c  in CNF:
c     b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ false 
c  in DIMACS:
 20633 -20634 -20635  0
c  -3 does not represent an automaton state.
c    -( b^{141, 2}_2 ∧  b^{141, 2}_1 ∧  b^{141, 2}_0 ∧ true) 
c  in CNF:
c    -b^{141, 2}_2 ∨ -b^{141, 2}_1 ∨ -b^{141, 2}_0 ∨ false 
c  in DIMACS:
-20633 -20634 -20635  0

c i = 3
c  -2+1 --> -1
c    ( b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧  p_423) -> ( b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0)
c  in CNF:
c    -b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨  b^{141, 4}_2
c    -b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_1
c    -b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨  b^{141, 4}_0
c  in DIMACS:
-20636 -20637  20638 -423  20639 0
-20636 -20637  20638 -423 -20640 0
-20636 -20637  20638 -423  20641 0

c  -1+1 --> 0
c    ( b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0 ∧  p_423) -> (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧ -b^{141, 4}_0)
c  in CNF:
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_2
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_1
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_0
c  in DIMACS:
-20636  20637 -20638 -423 -20639 0
-20636  20637 -20638 -423 -20640 0
-20636  20637 -20638 -423 -20641 0

c  0+1 --> 1
c    (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧  p_423) -> (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0)
c  in CNF:
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_2
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_1
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨  b^{141, 4}_0
c  in DIMACS:
 20636  20637  20638 -423 -20639 0
 20636  20637  20638 -423 -20640 0
 20636  20637  20638 -423  20641 0

c  1+1 --> 2
c    (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0 ∧  p_423) -> (-b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0)
c  in CNF:
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_2
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨  b^{141, 4}_1
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ -p_423 ∨ -b^{141, 4}_0
c  in DIMACS:
 20636  20637 -20638 -423 -20639 0
 20636  20637 -20638 -423  20640 0
 20636  20637 -20638 -423 -20641 0

c  2+1 --> break 
c    (-b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧  p_423) -> break
c  in CNF:
c     b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ -p_423 ∨ break
c  in DIMACS:
 20636 -20637  20638 -423 1162 0


c  2-1 --> 1
c    (-b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧ -p_423) -> (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0)
c  in CNF:
c     b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_2
c     b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_1
c     b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨  b^{141, 4}_0
c  in DIMACS:
 20636 -20637  20638  423 -20639 0
 20636 -20637  20638  423 -20640 0
 20636 -20637  20638  423  20641 0

c  1-1 --> 0
c    (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0 ∧ -p_423) -> (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧ -b^{141, 4}_0)
c  in CNF:
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_2
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_1
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_0
c  in DIMACS:
 20636  20637 -20638  423 -20639 0
 20636  20637 -20638  423 -20640 0
 20636  20637 -20638  423 -20641 0

c  0-1 --> -1
c    (-b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧ -p_423) -> ( b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0)
c  in CNF:
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨  b^{141, 4}_2
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_1
c     b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨  b^{141, 4}_0
c  in DIMACS:
 20636  20637  20638  423  20639 0
 20636  20637  20638  423 -20640 0
 20636  20637  20638  423  20641 0

c  -1-1 --> -2
c    ( b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧  b^{141, 3}_0 ∧ -p_423) -> ( b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0)
c  in CNF:
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨  b^{141, 4}_2
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨  b^{141, 4}_1
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨  p_423 ∨ -b^{141, 4}_0
c  in DIMACS:
-20636  20637 -20638  423  20639 0
-20636  20637 -20638  423  20640 0
-20636  20637 -20638  423 -20641 0

c  -2-1 --> break 
c    ( b^{141, 3}_2 ∧  b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧ -p_423) -> break
c  in CNF:
c    -b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨  b^{141, 3}_0 ∨  p_423 ∨ break
c  in DIMACS:
-20636 -20637  20638  423 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 3}_2 ∧ -b^{141, 3}_1 ∧ -b^{141, 3}_0 ∧ true) 
c  in CNF:
c    -b^{141, 3}_2 ∨  b^{141, 3}_1 ∨  b^{141, 3}_0 ∨ false 
c  in DIMACS:
-20636  20637  20638  0

c  3 does not represent an automaton state.
c    -(-b^{141, 3}_2 ∧  b^{141, 3}_1 ∧  b^{141, 3}_0 ∧ true) 
c  in CNF:
c     b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ false 
c  in DIMACS:
 20636 -20637 -20638  0
c  -3 does not represent an automaton state.
c    -( b^{141, 3}_2 ∧  b^{141, 3}_1 ∧  b^{141, 3}_0 ∧ true) 
c  in CNF:
c    -b^{141, 3}_2 ∨ -b^{141, 3}_1 ∨ -b^{141, 3}_0 ∨ false 
c  in DIMACS:
-20636 -20637 -20638  0

c i = 4
c  -2+1 --> -1
c    ( b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧  p_564) -> ( b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0)
c  in CNF:
c    -b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨  b^{141, 5}_2
c    -b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_1
c    -b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨  b^{141, 5}_0
c  in DIMACS:
-20639 -20640  20641 -564  20642 0
-20639 -20640  20641 -564 -20643 0
-20639 -20640  20641 -564  20644 0

c  -1+1 --> 0
c    ( b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0 ∧  p_564) -> (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧ -b^{141, 5}_0)
c  in CNF:
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_2
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_1
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_0
c  in DIMACS:
-20639  20640 -20641 -564 -20642 0
-20639  20640 -20641 -564 -20643 0
-20639  20640 -20641 -564 -20644 0

c  0+1 --> 1
c    (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧  p_564) -> (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0)
c  in CNF:
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_2
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_1
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨  b^{141, 5}_0
c  in DIMACS:
 20639  20640  20641 -564 -20642 0
 20639  20640  20641 -564 -20643 0
 20639  20640  20641 -564  20644 0

c  1+1 --> 2
c    (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0 ∧  p_564) -> (-b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0)
c  in CNF:
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_2
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨  b^{141, 5}_1
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ -p_564 ∨ -b^{141, 5}_0
c  in DIMACS:
 20639  20640 -20641 -564 -20642 0
 20639  20640 -20641 -564  20643 0
 20639  20640 -20641 -564 -20644 0

c  2+1 --> break 
c    (-b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧  p_564) -> break
c  in CNF:
c     b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 20639 -20640  20641 -564 1162 0


c  2-1 --> 1
c    (-b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧ -p_564) -> (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0)
c  in CNF:
c     b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_2
c     b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_1
c     b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨  b^{141, 5}_0
c  in DIMACS:
 20639 -20640  20641  564 -20642 0
 20639 -20640  20641  564 -20643 0
 20639 -20640  20641  564  20644 0

c  1-1 --> 0
c    (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0 ∧ -p_564) -> (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧ -b^{141, 5}_0)
c  in CNF:
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_2
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_1
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_0
c  in DIMACS:
 20639  20640 -20641  564 -20642 0
 20639  20640 -20641  564 -20643 0
 20639  20640 -20641  564 -20644 0

c  0-1 --> -1
c    (-b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧ -p_564) -> ( b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0)
c  in CNF:
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨  b^{141, 5}_2
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_1
c     b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨  b^{141, 5}_0
c  in DIMACS:
 20639  20640  20641  564  20642 0
 20639  20640  20641  564 -20643 0
 20639  20640  20641  564  20644 0

c  -1-1 --> -2
c    ( b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧  b^{141, 4}_0 ∧ -p_564) -> ( b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0)
c  in CNF:
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨  b^{141, 5}_2
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨  b^{141, 5}_1
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨  p_564 ∨ -b^{141, 5}_0
c  in DIMACS:
-20639  20640 -20641  564  20642 0
-20639  20640 -20641  564  20643 0
-20639  20640 -20641  564 -20644 0

c  -2-1 --> break 
c    ( b^{141, 4}_2 ∧  b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨  b^{141, 4}_0 ∨  p_564 ∨ break
c  in DIMACS:
-20639 -20640  20641  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 4}_2 ∧ -b^{141, 4}_1 ∧ -b^{141, 4}_0 ∧ true) 
c  in CNF:
c    -b^{141, 4}_2 ∨  b^{141, 4}_1 ∨  b^{141, 4}_0 ∨ false 
c  in DIMACS:
-20639  20640  20641  0

c  3 does not represent an automaton state.
c    -(-b^{141, 4}_2 ∧  b^{141, 4}_1 ∧  b^{141, 4}_0 ∧ true) 
c  in CNF:
c     b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ false 
c  in DIMACS:
 20639 -20640 -20641  0
c  -3 does not represent an automaton state.
c    -( b^{141, 4}_2 ∧  b^{141, 4}_1 ∧  b^{141, 4}_0 ∧ true) 
c  in CNF:
c    -b^{141, 4}_2 ∨ -b^{141, 4}_1 ∨ -b^{141, 4}_0 ∨ false 
c  in DIMACS:
-20639 -20640 -20641  0

c i = 5
c  -2+1 --> -1
c    ( b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧  p_705) -> ( b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0)
c  in CNF:
c    -b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨  b^{141, 6}_2
c    -b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_1
c    -b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨  b^{141, 6}_0
c  in DIMACS:
-20642 -20643  20644 -705  20645 0
-20642 -20643  20644 -705 -20646 0
-20642 -20643  20644 -705  20647 0

c  -1+1 --> 0
c    ( b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0 ∧  p_705) -> (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧ -b^{141, 6}_0)
c  in CNF:
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_2
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_1
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_0
c  in DIMACS:
-20642  20643 -20644 -705 -20645 0
-20642  20643 -20644 -705 -20646 0
-20642  20643 -20644 -705 -20647 0

c  0+1 --> 1
c    (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧  p_705) -> (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0)
c  in CNF:
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_2
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_1
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨  b^{141, 6}_0
c  in DIMACS:
 20642  20643  20644 -705 -20645 0
 20642  20643  20644 -705 -20646 0
 20642  20643  20644 -705  20647 0

c  1+1 --> 2
c    (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0 ∧  p_705) -> (-b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0)
c  in CNF:
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_2
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨  b^{141, 6}_1
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ -p_705 ∨ -b^{141, 6}_0
c  in DIMACS:
 20642  20643 -20644 -705 -20645 0
 20642  20643 -20644 -705  20646 0
 20642  20643 -20644 -705 -20647 0

c  2+1 --> break 
c    (-b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧  p_705) -> break
c  in CNF:
c     b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 20642 -20643  20644 -705 1162 0


c  2-1 --> 1
c    (-b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧ -p_705) -> (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0)
c  in CNF:
c     b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_2
c     b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_1
c     b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨  b^{141, 6}_0
c  in DIMACS:
 20642 -20643  20644  705 -20645 0
 20642 -20643  20644  705 -20646 0
 20642 -20643  20644  705  20647 0

c  1-1 --> 0
c    (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0 ∧ -p_705) -> (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧ -b^{141, 6}_0)
c  in CNF:
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_2
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_1
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_0
c  in DIMACS:
 20642  20643 -20644  705 -20645 0
 20642  20643 -20644  705 -20646 0
 20642  20643 -20644  705 -20647 0

c  0-1 --> -1
c    (-b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧ -p_705) -> ( b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0)
c  in CNF:
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨  b^{141, 6}_2
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_1
c     b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨  b^{141, 6}_0
c  in DIMACS:
 20642  20643  20644  705  20645 0
 20642  20643  20644  705 -20646 0
 20642  20643  20644  705  20647 0

c  -1-1 --> -2
c    ( b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧  b^{141, 5}_0 ∧ -p_705) -> ( b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0)
c  in CNF:
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨  b^{141, 6}_2
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨  b^{141, 6}_1
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨  p_705 ∨ -b^{141, 6}_0
c  in DIMACS:
-20642  20643 -20644  705  20645 0
-20642  20643 -20644  705  20646 0
-20642  20643 -20644  705 -20647 0

c  -2-1 --> break 
c    ( b^{141, 5}_2 ∧  b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨  b^{141, 5}_0 ∨  p_705 ∨ break
c  in DIMACS:
-20642 -20643  20644  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 5}_2 ∧ -b^{141, 5}_1 ∧ -b^{141, 5}_0 ∧ true) 
c  in CNF:
c    -b^{141, 5}_2 ∨  b^{141, 5}_1 ∨  b^{141, 5}_0 ∨ false 
c  in DIMACS:
-20642  20643  20644  0

c  3 does not represent an automaton state.
c    -(-b^{141, 5}_2 ∧  b^{141, 5}_1 ∧  b^{141, 5}_0 ∧ true) 
c  in CNF:
c     b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ false 
c  in DIMACS:
 20642 -20643 -20644  0
c  -3 does not represent an automaton state.
c    -( b^{141, 5}_2 ∧  b^{141, 5}_1 ∧  b^{141, 5}_0 ∧ true) 
c  in CNF:
c    -b^{141, 5}_2 ∨ -b^{141, 5}_1 ∨ -b^{141, 5}_0 ∨ false 
c  in DIMACS:
-20642 -20643 -20644  0

c i = 6
c  -2+1 --> -1
c    ( b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧  p_846) -> ( b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0)
c  in CNF:
c    -b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨  b^{141, 7}_2
c    -b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_1
c    -b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨  b^{141, 7}_0
c  in DIMACS:
-20645 -20646  20647 -846  20648 0
-20645 -20646  20647 -846 -20649 0
-20645 -20646  20647 -846  20650 0

c  -1+1 --> 0
c    ( b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0 ∧  p_846) -> (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧ -b^{141, 7}_0)
c  in CNF:
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_2
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_1
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_0
c  in DIMACS:
-20645  20646 -20647 -846 -20648 0
-20645  20646 -20647 -846 -20649 0
-20645  20646 -20647 -846 -20650 0

c  0+1 --> 1
c    (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧  p_846) -> (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0)
c  in CNF:
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_2
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_1
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨  b^{141, 7}_0
c  in DIMACS:
 20645  20646  20647 -846 -20648 0
 20645  20646  20647 -846 -20649 0
 20645  20646  20647 -846  20650 0

c  1+1 --> 2
c    (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0 ∧  p_846) -> (-b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0)
c  in CNF:
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_2
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨  b^{141, 7}_1
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ -p_846 ∨ -b^{141, 7}_0
c  in DIMACS:
 20645  20646 -20647 -846 -20648 0
 20645  20646 -20647 -846  20649 0
 20645  20646 -20647 -846 -20650 0

c  2+1 --> break 
c    (-b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧  p_846) -> break
c  in CNF:
c     b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 20645 -20646  20647 -846 1162 0


c  2-1 --> 1
c    (-b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧ -p_846) -> (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0)
c  in CNF:
c     b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_2
c     b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_1
c     b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨  b^{141, 7}_0
c  in DIMACS:
 20645 -20646  20647  846 -20648 0
 20645 -20646  20647  846 -20649 0
 20645 -20646  20647  846  20650 0

c  1-1 --> 0
c    (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0 ∧ -p_846) -> (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧ -b^{141, 7}_0)
c  in CNF:
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_2
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_1
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_0
c  in DIMACS:
 20645  20646 -20647  846 -20648 0
 20645  20646 -20647  846 -20649 0
 20645  20646 -20647  846 -20650 0

c  0-1 --> -1
c    (-b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧ -p_846) -> ( b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0)
c  in CNF:
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨  b^{141, 7}_2
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_1
c     b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨  b^{141, 7}_0
c  in DIMACS:
 20645  20646  20647  846  20648 0
 20645  20646  20647  846 -20649 0
 20645  20646  20647  846  20650 0

c  -1-1 --> -2
c    ( b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧  b^{141, 6}_0 ∧ -p_846) -> ( b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0)
c  in CNF:
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨  b^{141, 7}_2
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨  b^{141, 7}_1
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨  p_846 ∨ -b^{141, 7}_0
c  in DIMACS:
-20645  20646 -20647  846  20648 0
-20645  20646 -20647  846  20649 0
-20645  20646 -20647  846 -20650 0

c  -2-1 --> break 
c    ( b^{141, 6}_2 ∧  b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨  b^{141, 6}_0 ∨  p_846 ∨ break
c  in DIMACS:
-20645 -20646  20647  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 6}_2 ∧ -b^{141, 6}_1 ∧ -b^{141, 6}_0 ∧ true) 
c  in CNF:
c    -b^{141, 6}_2 ∨  b^{141, 6}_1 ∨  b^{141, 6}_0 ∨ false 
c  in DIMACS:
-20645  20646  20647  0

c  3 does not represent an automaton state.
c    -(-b^{141, 6}_2 ∧  b^{141, 6}_1 ∧  b^{141, 6}_0 ∧ true) 
c  in CNF:
c     b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ false 
c  in DIMACS:
 20645 -20646 -20647  0
c  -3 does not represent an automaton state.
c    -( b^{141, 6}_2 ∧  b^{141, 6}_1 ∧  b^{141, 6}_0 ∧ true) 
c  in CNF:
c    -b^{141, 6}_2 ∨ -b^{141, 6}_1 ∨ -b^{141, 6}_0 ∨ false 
c  in DIMACS:
-20645 -20646 -20647  0

c i = 7
c  -2+1 --> -1
c    ( b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧  p_987) -> ( b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0)
c  in CNF:
c    -b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨  b^{141, 8}_2
c    -b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_1
c    -b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨  b^{141, 8}_0
c  in DIMACS:
-20648 -20649  20650 -987  20651 0
-20648 -20649  20650 -987 -20652 0
-20648 -20649  20650 -987  20653 0

c  -1+1 --> 0
c    ( b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0 ∧  p_987) -> (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧ -b^{141, 8}_0)
c  in CNF:
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_2
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_1
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_0
c  in DIMACS:
-20648  20649 -20650 -987 -20651 0
-20648  20649 -20650 -987 -20652 0
-20648  20649 -20650 -987 -20653 0

c  0+1 --> 1
c    (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧  p_987) -> (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0)
c  in CNF:
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_2
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_1
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨  b^{141, 8}_0
c  in DIMACS:
 20648  20649  20650 -987 -20651 0
 20648  20649  20650 -987 -20652 0
 20648  20649  20650 -987  20653 0

c  1+1 --> 2
c    (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0 ∧  p_987) -> (-b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0)
c  in CNF:
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_2
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨  b^{141, 8}_1
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ -p_987 ∨ -b^{141, 8}_0
c  in DIMACS:
 20648  20649 -20650 -987 -20651 0
 20648  20649 -20650 -987  20652 0
 20648  20649 -20650 -987 -20653 0

c  2+1 --> break 
c    (-b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧  p_987) -> break
c  in CNF:
c     b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 20648 -20649  20650 -987 1162 0


c  2-1 --> 1
c    (-b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧ -p_987) -> (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0)
c  in CNF:
c     b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_2
c     b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_1
c     b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨  b^{141, 8}_0
c  in DIMACS:
 20648 -20649  20650  987 -20651 0
 20648 -20649  20650  987 -20652 0
 20648 -20649  20650  987  20653 0

c  1-1 --> 0
c    (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0 ∧ -p_987) -> (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧ -b^{141, 8}_0)
c  in CNF:
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_2
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_1
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_0
c  in DIMACS:
 20648  20649 -20650  987 -20651 0
 20648  20649 -20650  987 -20652 0
 20648  20649 -20650  987 -20653 0

c  0-1 --> -1
c    (-b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧ -p_987) -> ( b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0)
c  in CNF:
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨  b^{141, 8}_2
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_1
c     b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨  b^{141, 8}_0
c  in DIMACS:
 20648  20649  20650  987  20651 0
 20648  20649  20650  987 -20652 0
 20648  20649  20650  987  20653 0

c  -1-1 --> -2
c    ( b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧  b^{141, 7}_0 ∧ -p_987) -> ( b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0)
c  in CNF:
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨  b^{141, 8}_2
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨  b^{141, 8}_1
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨  p_987 ∨ -b^{141, 8}_0
c  in DIMACS:
-20648  20649 -20650  987  20651 0
-20648  20649 -20650  987  20652 0
-20648  20649 -20650  987 -20653 0

c  -2-1 --> break 
c    ( b^{141, 7}_2 ∧  b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨  b^{141, 7}_0 ∨  p_987 ∨ break
c  in DIMACS:
-20648 -20649  20650  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 7}_2 ∧ -b^{141, 7}_1 ∧ -b^{141, 7}_0 ∧ true) 
c  in CNF:
c    -b^{141, 7}_2 ∨  b^{141, 7}_1 ∨  b^{141, 7}_0 ∨ false 
c  in DIMACS:
-20648  20649  20650  0

c  3 does not represent an automaton state.
c    -(-b^{141, 7}_2 ∧  b^{141, 7}_1 ∧  b^{141, 7}_0 ∧ true) 
c  in CNF:
c     b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ false 
c  in DIMACS:
 20648 -20649 -20650  0
c  -3 does not represent an automaton state.
c    -( b^{141, 7}_2 ∧  b^{141, 7}_1 ∧  b^{141, 7}_0 ∧ true) 
c  in CNF:
c    -b^{141, 7}_2 ∨ -b^{141, 7}_1 ∨ -b^{141, 7}_0 ∨ false 
c  in DIMACS:
-20648 -20649 -20650  0

c i = 8
c  -2+1 --> -1
c    ( b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧  p_1128) -> ( b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧  b^{141, 9}_0)
c  in CNF:
c    -b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨  b^{141, 9}_2
c    -b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_1
c    -b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨  b^{141, 9}_0
c  in DIMACS:
-20651 -20652  20653 -1128  20654 0
-20651 -20652  20653 -1128 -20655 0
-20651 -20652  20653 -1128  20656 0

c  -1+1 --> 0
c    ( b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0 ∧  p_1128) -> (-b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧ -b^{141, 9}_0)
c  in CNF:
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_2
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_1
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_0
c  in DIMACS:
-20651  20652 -20653 -1128 -20654 0
-20651  20652 -20653 -1128 -20655 0
-20651  20652 -20653 -1128 -20656 0

c  0+1 --> 1
c    (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧  p_1128) -> (-b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧  b^{141, 9}_0)
c  in CNF:
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_2
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_1
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨  b^{141, 9}_0
c  in DIMACS:
 20651  20652  20653 -1128 -20654 0
 20651  20652  20653 -1128 -20655 0
 20651  20652  20653 -1128  20656 0

c  1+1 --> 2
c    (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0 ∧  p_1128) -> (-b^{141, 9}_2 ∧  b^{141, 9}_1 ∧ -b^{141, 9}_0)
c  in CNF:
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_2
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨  b^{141, 9}_1
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ -p_1128 ∨ -b^{141, 9}_0
c  in DIMACS:
 20651  20652 -20653 -1128 -20654 0
 20651  20652 -20653 -1128  20655 0
 20651  20652 -20653 -1128 -20656 0

c  2+1 --> break 
c    (-b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 20651 -20652  20653 -1128 1162 0


c  2-1 --> 1
c    (-b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧ -p_1128) -> (-b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧  b^{141, 9}_0)
c  in CNF:
c     b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_2
c     b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_1
c     b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨  b^{141, 9}_0
c  in DIMACS:
 20651 -20652  20653  1128 -20654 0
 20651 -20652  20653  1128 -20655 0
 20651 -20652  20653  1128  20656 0

c  1-1 --> 0
c    (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0 ∧ -p_1128) -> (-b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧ -b^{141, 9}_0)
c  in CNF:
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_2
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_1
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_0
c  in DIMACS:
 20651  20652 -20653  1128 -20654 0
 20651  20652 -20653  1128 -20655 0
 20651  20652 -20653  1128 -20656 0

c  0-1 --> -1
c    (-b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧ -p_1128) -> ( b^{141, 9}_2 ∧ -b^{141, 9}_1 ∧  b^{141, 9}_0)
c  in CNF:
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨  b^{141, 9}_2
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_1
c     b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨  b^{141, 9}_0
c  in DIMACS:
 20651  20652  20653  1128  20654 0
 20651  20652  20653  1128 -20655 0
 20651  20652  20653  1128  20656 0

c  -1-1 --> -2
c    ( b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧  b^{141, 8}_0 ∧ -p_1128) -> ( b^{141, 9}_2 ∧  b^{141, 9}_1 ∧ -b^{141, 9}_0)
c  in CNF:
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨  b^{141, 9}_2
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨  b^{141, 9}_1
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨  p_1128 ∨ -b^{141, 9}_0
c  in DIMACS:
-20651  20652 -20653  1128  20654 0
-20651  20652 -20653  1128  20655 0
-20651  20652 -20653  1128 -20656 0

c  -2-1 --> break 
c    ( b^{141, 8}_2 ∧  b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨  b^{141, 8}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-20651 -20652  20653  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{141, 8}_2 ∧ -b^{141, 8}_1 ∧ -b^{141, 8}_0 ∧ true) 
c  in CNF:
c    -b^{141, 8}_2 ∨  b^{141, 8}_1 ∨  b^{141, 8}_0 ∨ false 
c  in DIMACS:
-20651  20652  20653  0

c  3 does not represent an automaton state.
c    -(-b^{141, 8}_2 ∧  b^{141, 8}_1 ∧  b^{141, 8}_0 ∧ true) 
c  in CNF:
c     b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ false 
c  in DIMACS:
 20651 -20652 -20653  0
c  -3 does not represent an automaton state.
c    -( b^{141, 8}_2 ∧  b^{141, 8}_1 ∧  b^{141, 8}_0 ∧ true) 
c  in CNF:
c    -b^{141, 8}_2 ∨ -b^{141, 8}_1 ∨ -b^{141, 8}_0 ∨ false 
c  in DIMACS:
-20651 -20652 -20653  0

c INIT for k = 142
c    -b^{142, 1}_2
c    -b^{142, 1}_1
c    -b^{142, 1}_0
c  in DIMACS:
-20657 0
-20658 0
-20659 0

c Transitions for k = 142
c i = 1
c  -2+1 --> -1
c    ( b^{142, 1}_2 ∧  b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧  p_142) -> ( b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0)
c  in CNF:
c    -b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨  b^{142, 2}_2
c    -b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_1
c    -b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨  b^{142, 2}_0
c  in DIMACS:
-20657 -20658  20659 -142  20660 0
-20657 -20658  20659 -142 -20661 0
-20657 -20658  20659 -142  20662 0

c  -1+1 --> 0
c    ( b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧  b^{142, 1}_0 ∧  p_142) -> (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧ -b^{142, 2}_0)
c  in CNF:
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_2
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_1
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_0
c  in DIMACS:
-20657  20658 -20659 -142 -20660 0
-20657  20658 -20659 -142 -20661 0
-20657  20658 -20659 -142 -20662 0

c  0+1 --> 1
c    (-b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧  p_142) -> (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0)
c  in CNF:
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_2
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_1
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨  b^{142, 2}_0
c  in DIMACS:
 20657  20658  20659 -142 -20660 0
 20657  20658  20659 -142 -20661 0
 20657  20658  20659 -142  20662 0

c  1+1 --> 2
c    (-b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧  b^{142, 1}_0 ∧  p_142) -> (-b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0)
c  in CNF:
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_2
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨  b^{142, 2}_1
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ -p_142 ∨ -b^{142, 2}_0
c  in DIMACS:
 20657  20658 -20659 -142 -20660 0
 20657  20658 -20659 -142  20661 0
 20657  20658 -20659 -142 -20662 0

c  2+1 --> break 
c    (-b^{142, 1}_2 ∧  b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧  p_142) -> break
c  in CNF:
c     b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ -p_142 ∨ break
c  in DIMACS:
 20657 -20658  20659 -142 1162 0


c  2-1 --> 1
c    (-b^{142, 1}_2 ∧  b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧ -p_142) -> (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0)
c  in CNF:
c     b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_2
c     b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_1
c     b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨  b^{142, 2}_0
c  in DIMACS:
 20657 -20658  20659  142 -20660 0
 20657 -20658  20659  142 -20661 0
 20657 -20658  20659  142  20662 0

c  1-1 --> 0
c    (-b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧  b^{142, 1}_0 ∧ -p_142) -> (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧ -b^{142, 2}_0)
c  in CNF:
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_2
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_1
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_0
c  in DIMACS:
 20657  20658 -20659  142 -20660 0
 20657  20658 -20659  142 -20661 0
 20657  20658 -20659  142 -20662 0

c  0-1 --> -1
c    (-b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧ -p_142) -> ( b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0)
c  in CNF:
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨  b^{142, 2}_2
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_1
c     b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨  b^{142, 2}_0
c  in DIMACS:
 20657  20658  20659  142  20660 0
 20657  20658  20659  142 -20661 0
 20657  20658  20659  142  20662 0

c  -1-1 --> -2
c    ( b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧  b^{142, 1}_0 ∧ -p_142) -> ( b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0)
c  in CNF:
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨  b^{142, 2}_2
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨  b^{142, 2}_1
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨  p_142 ∨ -b^{142, 2}_0
c  in DIMACS:
-20657  20658 -20659  142  20660 0
-20657  20658 -20659  142  20661 0
-20657  20658 -20659  142 -20662 0

c  -2-1 --> break 
c    ( b^{142, 1}_2 ∧  b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧ -p_142) -> break
c  in CNF:
c    -b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨  b^{142, 1}_0 ∨  p_142 ∨ break
c  in DIMACS:
-20657 -20658  20659  142 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 1}_2 ∧ -b^{142, 1}_1 ∧ -b^{142, 1}_0 ∧ true) 
c  in CNF:
c    -b^{142, 1}_2 ∨  b^{142, 1}_1 ∨  b^{142, 1}_0 ∨ false 
c  in DIMACS:
-20657  20658  20659  0

c  3 does not represent an automaton state.
c    -(-b^{142, 1}_2 ∧  b^{142, 1}_1 ∧  b^{142, 1}_0 ∧ true) 
c  in CNF:
c     b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ false 
c  in DIMACS:
 20657 -20658 -20659  0
c  -3 does not represent an automaton state.
c    -( b^{142, 1}_2 ∧  b^{142, 1}_1 ∧  b^{142, 1}_0 ∧ true) 
c  in CNF:
c    -b^{142, 1}_2 ∨ -b^{142, 1}_1 ∨ -b^{142, 1}_0 ∨ false 
c  in DIMACS:
-20657 -20658 -20659  0

c i = 2
c  -2+1 --> -1
c    ( b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧  p_284) -> ( b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0)
c  in CNF:
c    -b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨  b^{142, 3}_2
c    -b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_1
c    -b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨  b^{142, 3}_0
c  in DIMACS:
-20660 -20661  20662 -284  20663 0
-20660 -20661  20662 -284 -20664 0
-20660 -20661  20662 -284  20665 0

c  -1+1 --> 0
c    ( b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0 ∧  p_284) -> (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧ -b^{142, 3}_0)
c  in CNF:
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_2
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_1
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_0
c  in DIMACS:
-20660  20661 -20662 -284 -20663 0
-20660  20661 -20662 -284 -20664 0
-20660  20661 -20662 -284 -20665 0

c  0+1 --> 1
c    (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧  p_284) -> (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0)
c  in CNF:
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_2
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_1
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨  b^{142, 3}_0
c  in DIMACS:
 20660  20661  20662 -284 -20663 0
 20660  20661  20662 -284 -20664 0
 20660  20661  20662 -284  20665 0

c  1+1 --> 2
c    (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0 ∧  p_284) -> (-b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0)
c  in CNF:
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_2
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨  b^{142, 3}_1
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ -p_284 ∨ -b^{142, 3}_0
c  in DIMACS:
 20660  20661 -20662 -284 -20663 0
 20660  20661 -20662 -284  20664 0
 20660  20661 -20662 -284 -20665 0

c  2+1 --> break 
c    (-b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧  p_284) -> break
c  in CNF:
c     b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 20660 -20661  20662 -284 1162 0


c  2-1 --> 1
c    (-b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧ -p_284) -> (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0)
c  in CNF:
c     b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_2
c     b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_1
c     b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨  b^{142, 3}_0
c  in DIMACS:
 20660 -20661  20662  284 -20663 0
 20660 -20661  20662  284 -20664 0
 20660 -20661  20662  284  20665 0

c  1-1 --> 0
c    (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0 ∧ -p_284) -> (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧ -b^{142, 3}_0)
c  in CNF:
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_2
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_1
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_0
c  in DIMACS:
 20660  20661 -20662  284 -20663 0
 20660  20661 -20662  284 -20664 0
 20660  20661 -20662  284 -20665 0

c  0-1 --> -1
c    (-b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧ -p_284) -> ( b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0)
c  in CNF:
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨  b^{142, 3}_2
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_1
c     b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨  b^{142, 3}_0
c  in DIMACS:
 20660  20661  20662  284  20663 0
 20660  20661  20662  284 -20664 0
 20660  20661  20662  284  20665 0

c  -1-1 --> -2
c    ( b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧  b^{142, 2}_0 ∧ -p_284) -> ( b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0)
c  in CNF:
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨  b^{142, 3}_2
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨  b^{142, 3}_1
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨  p_284 ∨ -b^{142, 3}_0
c  in DIMACS:
-20660  20661 -20662  284  20663 0
-20660  20661 -20662  284  20664 0
-20660  20661 -20662  284 -20665 0

c  -2-1 --> break 
c    ( b^{142, 2}_2 ∧  b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨  b^{142, 2}_0 ∨  p_284 ∨ break
c  in DIMACS:
-20660 -20661  20662  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 2}_2 ∧ -b^{142, 2}_1 ∧ -b^{142, 2}_0 ∧ true) 
c  in CNF:
c    -b^{142, 2}_2 ∨  b^{142, 2}_1 ∨  b^{142, 2}_0 ∨ false 
c  in DIMACS:
-20660  20661  20662  0

c  3 does not represent an automaton state.
c    -(-b^{142, 2}_2 ∧  b^{142, 2}_1 ∧  b^{142, 2}_0 ∧ true) 
c  in CNF:
c     b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ false 
c  in DIMACS:
 20660 -20661 -20662  0
c  -3 does not represent an automaton state.
c    -( b^{142, 2}_2 ∧  b^{142, 2}_1 ∧  b^{142, 2}_0 ∧ true) 
c  in CNF:
c    -b^{142, 2}_2 ∨ -b^{142, 2}_1 ∨ -b^{142, 2}_0 ∨ false 
c  in DIMACS:
-20660 -20661 -20662  0

c i = 3
c  -2+1 --> -1
c    ( b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧  p_426) -> ( b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0)
c  in CNF:
c    -b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨  b^{142, 4}_2
c    -b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_1
c    -b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨  b^{142, 4}_0
c  in DIMACS:
-20663 -20664  20665 -426  20666 0
-20663 -20664  20665 -426 -20667 0
-20663 -20664  20665 -426  20668 0

c  -1+1 --> 0
c    ( b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0 ∧  p_426) -> (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧ -b^{142, 4}_0)
c  in CNF:
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_2
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_1
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_0
c  in DIMACS:
-20663  20664 -20665 -426 -20666 0
-20663  20664 -20665 -426 -20667 0
-20663  20664 -20665 -426 -20668 0

c  0+1 --> 1
c    (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧  p_426) -> (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0)
c  in CNF:
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_2
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_1
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨  b^{142, 4}_0
c  in DIMACS:
 20663  20664  20665 -426 -20666 0
 20663  20664  20665 -426 -20667 0
 20663  20664  20665 -426  20668 0

c  1+1 --> 2
c    (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0 ∧  p_426) -> (-b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0)
c  in CNF:
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_2
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨  b^{142, 4}_1
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ -p_426 ∨ -b^{142, 4}_0
c  in DIMACS:
 20663  20664 -20665 -426 -20666 0
 20663  20664 -20665 -426  20667 0
 20663  20664 -20665 -426 -20668 0

c  2+1 --> break 
c    (-b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧  p_426) -> break
c  in CNF:
c     b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 20663 -20664  20665 -426 1162 0


c  2-1 --> 1
c    (-b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧ -p_426) -> (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0)
c  in CNF:
c     b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_2
c     b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_1
c     b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨  b^{142, 4}_0
c  in DIMACS:
 20663 -20664  20665  426 -20666 0
 20663 -20664  20665  426 -20667 0
 20663 -20664  20665  426  20668 0

c  1-1 --> 0
c    (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0 ∧ -p_426) -> (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧ -b^{142, 4}_0)
c  in CNF:
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_2
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_1
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_0
c  in DIMACS:
 20663  20664 -20665  426 -20666 0
 20663  20664 -20665  426 -20667 0
 20663  20664 -20665  426 -20668 0

c  0-1 --> -1
c    (-b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧ -p_426) -> ( b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0)
c  in CNF:
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨  b^{142, 4}_2
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_1
c     b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨  b^{142, 4}_0
c  in DIMACS:
 20663  20664  20665  426  20666 0
 20663  20664  20665  426 -20667 0
 20663  20664  20665  426  20668 0

c  -1-1 --> -2
c    ( b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧  b^{142, 3}_0 ∧ -p_426) -> ( b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0)
c  in CNF:
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨  b^{142, 4}_2
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨  b^{142, 4}_1
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨  p_426 ∨ -b^{142, 4}_0
c  in DIMACS:
-20663  20664 -20665  426  20666 0
-20663  20664 -20665  426  20667 0
-20663  20664 -20665  426 -20668 0

c  -2-1 --> break 
c    ( b^{142, 3}_2 ∧  b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨  b^{142, 3}_0 ∨  p_426 ∨ break
c  in DIMACS:
-20663 -20664  20665  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 3}_2 ∧ -b^{142, 3}_1 ∧ -b^{142, 3}_0 ∧ true) 
c  in CNF:
c    -b^{142, 3}_2 ∨  b^{142, 3}_1 ∨  b^{142, 3}_0 ∨ false 
c  in DIMACS:
-20663  20664  20665  0

c  3 does not represent an automaton state.
c    -(-b^{142, 3}_2 ∧  b^{142, 3}_1 ∧  b^{142, 3}_0 ∧ true) 
c  in CNF:
c     b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ false 
c  in DIMACS:
 20663 -20664 -20665  0
c  -3 does not represent an automaton state.
c    -( b^{142, 3}_2 ∧  b^{142, 3}_1 ∧  b^{142, 3}_0 ∧ true) 
c  in CNF:
c    -b^{142, 3}_2 ∨ -b^{142, 3}_1 ∨ -b^{142, 3}_0 ∨ false 
c  in DIMACS:
-20663 -20664 -20665  0

c i = 4
c  -2+1 --> -1
c    ( b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧  p_568) -> ( b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0)
c  in CNF:
c    -b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨  b^{142, 5}_2
c    -b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_1
c    -b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨  b^{142, 5}_0
c  in DIMACS:
-20666 -20667  20668 -568  20669 0
-20666 -20667  20668 -568 -20670 0
-20666 -20667  20668 -568  20671 0

c  -1+1 --> 0
c    ( b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0 ∧  p_568) -> (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧ -b^{142, 5}_0)
c  in CNF:
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_2
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_1
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_0
c  in DIMACS:
-20666  20667 -20668 -568 -20669 0
-20666  20667 -20668 -568 -20670 0
-20666  20667 -20668 -568 -20671 0

c  0+1 --> 1
c    (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧  p_568) -> (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0)
c  in CNF:
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_2
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_1
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨  b^{142, 5}_0
c  in DIMACS:
 20666  20667  20668 -568 -20669 0
 20666  20667  20668 -568 -20670 0
 20666  20667  20668 -568  20671 0

c  1+1 --> 2
c    (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0 ∧  p_568) -> (-b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0)
c  in CNF:
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_2
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨  b^{142, 5}_1
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ -p_568 ∨ -b^{142, 5}_0
c  in DIMACS:
 20666  20667 -20668 -568 -20669 0
 20666  20667 -20668 -568  20670 0
 20666  20667 -20668 -568 -20671 0

c  2+1 --> break 
c    (-b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧  p_568) -> break
c  in CNF:
c     b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 20666 -20667  20668 -568 1162 0


c  2-1 --> 1
c    (-b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧ -p_568) -> (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0)
c  in CNF:
c     b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_2
c     b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_1
c     b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨  b^{142, 5}_0
c  in DIMACS:
 20666 -20667  20668  568 -20669 0
 20666 -20667  20668  568 -20670 0
 20666 -20667  20668  568  20671 0

c  1-1 --> 0
c    (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0 ∧ -p_568) -> (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧ -b^{142, 5}_0)
c  in CNF:
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_2
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_1
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_0
c  in DIMACS:
 20666  20667 -20668  568 -20669 0
 20666  20667 -20668  568 -20670 0
 20666  20667 -20668  568 -20671 0

c  0-1 --> -1
c    (-b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧ -p_568) -> ( b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0)
c  in CNF:
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨  b^{142, 5}_2
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_1
c     b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨  b^{142, 5}_0
c  in DIMACS:
 20666  20667  20668  568  20669 0
 20666  20667  20668  568 -20670 0
 20666  20667  20668  568  20671 0

c  -1-1 --> -2
c    ( b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧  b^{142, 4}_0 ∧ -p_568) -> ( b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0)
c  in CNF:
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨  b^{142, 5}_2
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨  b^{142, 5}_1
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨  p_568 ∨ -b^{142, 5}_0
c  in DIMACS:
-20666  20667 -20668  568  20669 0
-20666  20667 -20668  568  20670 0
-20666  20667 -20668  568 -20671 0

c  -2-1 --> break 
c    ( b^{142, 4}_2 ∧  b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨  b^{142, 4}_0 ∨  p_568 ∨ break
c  in DIMACS:
-20666 -20667  20668  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 4}_2 ∧ -b^{142, 4}_1 ∧ -b^{142, 4}_0 ∧ true) 
c  in CNF:
c    -b^{142, 4}_2 ∨  b^{142, 4}_1 ∨  b^{142, 4}_0 ∨ false 
c  in DIMACS:
-20666  20667  20668  0

c  3 does not represent an automaton state.
c    -(-b^{142, 4}_2 ∧  b^{142, 4}_1 ∧  b^{142, 4}_0 ∧ true) 
c  in CNF:
c     b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ false 
c  in DIMACS:
 20666 -20667 -20668  0
c  -3 does not represent an automaton state.
c    -( b^{142, 4}_2 ∧  b^{142, 4}_1 ∧  b^{142, 4}_0 ∧ true) 
c  in CNF:
c    -b^{142, 4}_2 ∨ -b^{142, 4}_1 ∨ -b^{142, 4}_0 ∨ false 
c  in DIMACS:
-20666 -20667 -20668  0

c i = 5
c  -2+1 --> -1
c    ( b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧  p_710) -> ( b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0)
c  in CNF:
c    -b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨  b^{142, 6}_2
c    -b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_1
c    -b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨  b^{142, 6}_0
c  in DIMACS:
-20669 -20670  20671 -710  20672 0
-20669 -20670  20671 -710 -20673 0
-20669 -20670  20671 -710  20674 0

c  -1+1 --> 0
c    ( b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0 ∧  p_710) -> (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧ -b^{142, 6}_0)
c  in CNF:
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_2
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_1
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_0
c  in DIMACS:
-20669  20670 -20671 -710 -20672 0
-20669  20670 -20671 -710 -20673 0
-20669  20670 -20671 -710 -20674 0

c  0+1 --> 1
c    (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧  p_710) -> (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0)
c  in CNF:
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_2
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_1
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨  b^{142, 6}_0
c  in DIMACS:
 20669  20670  20671 -710 -20672 0
 20669  20670  20671 -710 -20673 0
 20669  20670  20671 -710  20674 0

c  1+1 --> 2
c    (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0 ∧  p_710) -> (-b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0)
c  in CNF:
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_2
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨  b^{142, 6}_1
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ -p_710 ∨ -b^{142, 6}_0
c  in DIMACS:
 20669  20670 -20671 -710 -20672 0
 20669  20670 -20671 -710  20673 0
 20669  20670 -20671 -710 -20674 0

c  2+1 --> break 
c    (-b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧  p_710) -> break
c  in CNF:
c     b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 20669 -20670  20671 -710 1162 0


c  2-1 --> 1
c    (-b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧ -p_710) -> (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0)
c  in CNF:
c     b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_2
c     b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_1
c     b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨  b^{142, 6}_0
c  in DIMACS:
 20669 -20670  20671  710 -20672 0
 20669 -20670  20671  710 -20673 0
 20669 -20670  20671  710  20674 0

c  1-1 --> 0
c    (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0 ∧ -p_710) -> (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧ -b^{142, 6}_0)
c  in CNF:
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_2
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_1
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_0
c  in DIMACS:
 20669  20670 -20671  710 -20672 0
 20669  20670 -20671  710 -20673 0
 20669  20670 -20671  710 -20674 0

c  0-1 --> -1
c    (-b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧ -p_710) -> ( b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0)
c  in CNF:
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨  b^{142, 6}_2
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_1
c     b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨  b^{142, 6}_0
c  in DIMACS:
 20669  20670  20671  710  20672 0
 20669  20670  20671  710 -20673 0
 20669  20670  20671  710  20674 0

c  -1-1 --> -2
c    ( b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧  b^{142, 5}_0 ∧ -p_710) -> ( b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0)
c  in CNF:
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨  b^{142, 6}_2
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨  b^{142, 6}_1
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨  p_710 ∨ -b^{142, 6}_0
c  in DIMACS:
-20669  20670 -20671  710  20672 0
-20669  20670 -20671  710  20673 0
-20669  20670 -20671  710 -20674 0

c  -2-1 --> break 
c    ( b^{142, 5}_2 ∧  b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨  b^{142, 5}_0 ∨  p_710 ∨ break
c  in DIMACS:
-20669 -20670  20671  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 5}_2 ∧ -b^{142, 5}_1 ∧ -b^{142, 5}_0 ∧ true) 
c  in CNF:
c    -b^{142, 5}_2 ∨  b^{142, 5}_1 ∨  b^{142, 5}_0 ∨ false 
c  in DIMACS:
-20669  20670  20671  0

c  3 does not represent an automaton state.
c    -(-b^{142, 5}_2 ∧  b^{142, 5}_1 ∧  b^{142, 5}_0 ∧ true) 
c  in CNF:
c     b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ false 
c  in DIMACS:
 20669 -20670 -20671  0
c  -3 does not represent an automaton state.
c    -( b^{142, 5}_2 ∧  b^{142, 5}_1 ∧  b^{142, 5}_0 ∧ true) 
c  in CNF:
c    -b^{142, 5}_2 ∨ -b^{142, 5}_1 ∨ -b^{142, 5}_0 ∨ false 
c  in DIMACS:
-20669 -20670 -20671  0

c i = 6
c  -2+1 --> -1
c    ( b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧  p_852) -> ( b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0)
c  in CNF:
c    -b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨  b^{142, 7}_2
c    -b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_1
c    -b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨  b^{142, 7}_0
c  in DIMACS:
-20672 -20673  20674 -852  20675 0
-20672 -20673  20674 -852 -20676 0
-20672 -20673  20674 -852  20677 0

c  -1+1 --> 0
c    ( b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0 ∧  p_852) -> (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧ -b^{142, 7}_0)
c  in CNF:
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_2
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_1
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_0
c  in DIMACS:
-20672  20673 -20674 -852 -20675 0
-20672  20673 -20674 -852 -20676 0
-20672  20673 -20674 -852 -20677 0

c  0+1 --> 1
c    (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧  p_852) -> (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0)
c  in CNF:
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_2
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_1
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨  b^{142, 7}_0
c  in DIMACS:
 20672  20673  20674 -852 -20675 0
 20672  20673  20674 -852 -20676 0
 20672  20673  20674 -852  20677 0

c  1+1 --> 2
c    (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0 ∧  p_852) -> (-b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0)
c  in CNF:
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_2
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨  b^{142, 7}_1
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ -p_852 ∨ -b^{142, 7}_0
c  in DIMACS:
 20672  20673 -20674 -852 -20675 0
 20672  20673 -20674 -852  20676 0
 20672  20673 -20674 -852 -20677 0

c  2+1 --> break 
c    (-b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧  p_852) -> break
c  in CNF:
c     b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 20672 -20673  20674 -852 1162 0


c  2-1 --> 1
c    (-b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧ -p_852) -> (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0)
c  in CNF:
c     b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_2
c     b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_1
c     b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨  b^{142, 7}_0
c  in DIMACS:
 20672 -20673  20674  852 -20675 0
 20672 -20673  20674  852 -20676 0
 20672 -20673  20674  852  20677 0

c  1-1 --> 0
c    (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0 ∧ -p_852) -> (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧ -b^{142, 7}_0)
c  in CNF:
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_2
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_1
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_0
c  in DIMACS:
 20672  20673 -20674  852 -20675 0
 20672  20673 -20674  852 -20676 0
 20672  20673 -20674  852 -20677 0

c  0-1 --> -1
c    (-b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧ -p_852) -> ( b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0)
c  in CNF:
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨  b^{142, 7}_2
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_1
c     b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨  b^{142, 7}_0
c  in DIMACS:
 20672  20673  20674  852  20675 0
 20672  20673  20674  852 -20676 0
 20672  20673  20674  852  20677 0

c  -1-1 --> -2
c    ( b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧  b^{142, 6}_0 ∧ -p_852) -> ( b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0)
c  in CNF:
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨  b^{142, 7}_2
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨  b^{142, 7}_1
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨  p_852 ∨ -b^{142, 7}_0
c  in DIMACS:
-20672  20673 -20674  852  20675 0
-20672  20673 -20674  852  20676 0
-20672  20673 -20674  852 -20677 0

c  -2-1 --> break 
c    ( b^{142, 6}_2 ∧  b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨  b^{142, 6}_0 ∨  p_852 ∨ break
c  in DIMACS:
-20672 -20673  20674  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 6}_2 ∧ -b^{142, 6}_1 ∧ -b^{142, 6}_0 ∧ true) 
c  in CNF:
c    -b^{142, 6}_2 ∨  b^{142, 6}_1 ∨  b^{142, 6}_0 ∨ false 
c  in DIMACS:
-20672  20673  20674  0

c  3 does not represent an automaton state.
c    -(-b^{142, 6}_2 ∧  b^{142, 6}_1 ∧  b^{142, 6}_0 ∧ true) 
c  in CNF:
c     b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ false 
c  in DIMACS:
 20672 -20673 -20674  0
c  -3 does not represent an automaton state.
c    -( b^{142, 6}_2 ∧  b^{142, 6}_1 ∧  b^{142, 6}_0 ∧ true) 
c  in CNF:
c    -b^{142, 6}_2 ∨ -b^{142, 6}_1 ∨ -b^{142, 6}_0 ∨ false 
c  in DIMACS:
-20672 -20673 -20674  0

c i = 7
c  -2+1 --> -1
c    ( b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧  p_994) -> ( b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0)
c  in CNF:
c    -b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨  b^{142, 8}_2
c    -b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_1
c    -b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨  b^{142, 8}_0
c  in DIMACS:
-20675 -20676  20677 -994  20678 0
-20675 -20676  20677 -994 -20679 0
-20675 -20676  20677 -994  20680 0

c  -1+1 --> 0
c    ( b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0 ∧  p_994) -> (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧ -b^{142, 8}_0)
c  in CNF:
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_2
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_1
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_0
c  in DIMACS:
-20675  20676 -20677 -994 -20678 0
-20675  20676 -20677 -994 -20679 0
-20675  20676 -20677 -994 -20680 0

c  0+1 --> 1
c    (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧  p_994) -> (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0)
c  in CNF:
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_2
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_1
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨  b^{142, 8}_0
c  in DIMACS:
 20675  20676  20677 -994 -20678 0
 20675  20676  20677 -994 -20679 0
 20675  20676  20677 -994  20680 0

c  1+1 --> 2
c    (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0 ∧  p_994) -> (-b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0)
c  in CNF:
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_2
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨  b^{142, 8}_1
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ -p_994 ∨ -b^{142, 8}_0
c  in DIMACS:
 20675  20676 -20677 -994 -20678 0
 20675  20676 -20677 -994  20679 0
 20675  20676 -20677 -994 -20680 0

c  2+1 --> break 
c    (-b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧  p_994) -> break
c  in CNF:
c     b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ -p_994 ∨ break
c  in DIMACS:
 20675 -20676  20677 -994 1162 0


c  2-1 --> 1
c    (-b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧ -p_994) -> (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0)
c  in CNF:
c     b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_2
c     b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_1
c     b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨  b^{142, 8}_0
c  in DIMACS:
 20675 -20676  20677  994 -20678 0
 20675 -20676  20677  994 -20679 0
 20675 -20676  20677  994  20680 0

c  1-1 --> 0
c    (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0 ∧ -p_994) -> (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧ -b^{142, 8}_0)
c  in CNF:
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_2
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_1
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_0
c  in DIMACS:
 20675  20676 -20677  994 -20678 0
 20675  20676 -20677  994 -20679 0
 20675  20676 -20677  994 -20680 0

c  0-1 --> -1
c    (-b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧ -p_994) -> ( b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0)
c  in CNF:
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨  b^{142, 8}_2
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_1
c     b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨  b^{142, 8}_0
c  in DIMACS:
 20675  20676  20677  994  20678 0
 20675  20676  20677  994 -20679 0
 20675  20676  20677  994  20680 0

c  -1-1 --> -2
c    ( b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧  b^{142, 7}_0 ∧ -p_994) -> ( b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0)
c  in CNF:
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨  b^{142, 8}_2
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨  b^{142, 8}_1
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨  p_994 ∨ -b^{142, 8}_0
c  in DIMACS:
-20675  20676 -20677  994  20678 0
-20675  20676 -20677  994  20679 0
-20675  20676 -20677  994 -20680 0

c  -2-1 --> break 
c    ( b^{142, 7}_2 ∧  b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧ -p_994) -> break
c  in CNF:
c    -b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨  b^{142, 7}_0 ∨  p_994 ∨ break
c  in DIMACS:
-20675 -20676  20677  994 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 7}_2 ∧ -b^{142, 7}_1 ∧ -b^{142, 7}_0 ∧ true) 
c  in CNF:
c    -b^{142, 7}_2 ∨  b^{142, 7}_1 ∨  b^{142, 7}_0 ∨ false 
c  in DIMACS:
-20675  20676  20677  0

c  3 does not represent an automaton state.
c    -(-b^{142, 7}_2 ∧  b^{142, 7}_1 ∧  b^{142, 7}_0 ∧ true) 
c  in CNF:
c     b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ false 
c  in DIMACS:
 20675 -20676 -20677  0
c  -3 does not represent an automaton state.
c    -( b^{142, 7}_2 ∧  b^{142, 7}_1 ∧  b^{142, 7}_0 ∧ true) 
c  in CNF:
c    -b^{142, 7}_2 ∨ -b^{142, 7}_1 ∨ -b^{142, 7}_0 ∨ false 
c  in DIMACS:
-20675 -20676 -20677  0

c i = 8
c  -2+1 --> -1
c    ( b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧  p_1136) -> ( b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧  b^{142, 9}_0)
c  in CNF:
c    -b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨  b^{142, 9}_2
c    -b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_1
c    -b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨  b^{142, 9}_0
c  in DIMACS:
-20678 -20679  20680 -1136  20681 0
-20678 -20679  20680 -1136 -20682 0
-20678 -20679  20680 -1136  20683 0

c  -1+1 --> 0
c    ( b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0 ∧  p_1136) -> (-b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧ -b^{142, 9}_0)
c  in CNF:
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_2
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_1
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_0
c  in DIMACS:
-20678  20679 -20680 -1136 -20681 0
-20678  20679 -20680 -1136 -20682 0
-20678  20679 -20680 -1136 -20683 0

c  0+1 --> 1
c    (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧  p_1136) -> (-b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧  b^{142, 9}_0)
c  in CNF:
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_2
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_1
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨  b^{142, 9}_0
c  in DIMACS:
 20678  20679  20680 -1136 -20681 0
 20678  20679  20680 -1136 -20682 0
 20678  20679  20680 -1136  20683 0

c  1+1 --> 2
c    (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0 ∧  p_1136) -> (-b^{142, 9}_2 ∧  b^{142, 9}_1 ∧ -b^{142, 9}_0)
c  in CNF:
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_2
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨  b^{142, 9}_1
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ -p_1136 ∨ -b^{142, 9}_0
c  in DIMACS:
 20678  20679 -20680 -1136 -20681 0
 20678  20679 -20680 -1136  20682 0
 20678  20679 -20680 -1136 -20683 0

c  2+1 --> break 
c    (-b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 20678 -20679  20680 -1136 1162 0


c  2-1 --> 1
c    (-b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧ -p_1136) -> (-b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧  b^{142, 9}_0)
c  in CNF:
c     b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_2
c     b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_1
c     b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨  b^{142, 9}_0
c  in DIMACS:
 20678 -20679  20680  1136 -20681 0
 20678 -20679  20680  1136 -20682 0
 20678 -20679  20680  1136  20683 0

c  1-1 --> 0
c    (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0 ∧ -p_1136) -> (-b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧ -b^{142, 9}_0)
c  in CNF:
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_2
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_1
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_0
c  in DIMACS:
 20678  20679 -20680  1136 -20681 0
 20678  20679 -20680  1136 -20682 0
 20678  20679 -20680  1136 -20683 0

c  0-1 --> -1
c    (-b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧ -p_1136) -> ( b^{142, 9}_2 ∧ -b^{142, 9}_1 ∧  b^{142, 9}_0)
c  in CNF:
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨  b^{142, 9}_2
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_1
c     b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨  b^{142, 9}_0
c  in DIMACS:
 20678  20679  20680  1136  20681 0
 20678  20679  20680  1136 -20682 0
 20678  20679  20680  1136  20683 0

c  -1-1 --> -2
c    ( b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧  b^{142, 8}_0 ∧ -p_1136) -> ( b^{142, 9}_2 ∧  b^{142, 9}_1 ∧ -b^{142, 9}_0)
c  in CNF:
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨  b^{142, 9}_2
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨  b^{142, 9}_1
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨  p_1136 ∨ -b^{142, 9}_0
c  in DIMACS:
-20678  20679 -20680  1136  20681 0
-20678  20679 -20680  1136  20682 0
-20678  20679 -20680  1136 -20683 0

c  -2-1 --> break 
c    ( b^{142, 8}_2 ∧  b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨  b^{142, 8}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-20678 -20679  20680  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{142, 8}_2 ∧ -b^{142, 8}_1 ∧ -b^{142, 8}_0 ∧ true) 
c  in CNF:
c    -b^{142, 8}_2 ∨  b^{142, 8}_1 ∨  b^{142, 8}_0 ∨ false 
c  in DIMACS:
-20678  20679  20680  0

c  3 does not represent an automaton state.
c    -(-b^{142, 8}_2 ∧  b^{142, 8}_1 ∧  b^{142, 8}_0 ∧ true) 
c  in CNF:
c     b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ false 
c  in DIMACS:
 20678 -20679 -20680  0
c  -3 does not represent an automaton state.
c    -( b^{142, 8}_2 ∧  b^{142, 8}_1 ∧  b^{142, 8}_0 ∧ true) 
c  in CNF:
c    -b^{142, 8}_2 ∨ -b^{142, 8}_1 ∨ -b^{142, 8}_0 ∨ false 
c  in DIMACS:
-20678 -20679 -20680  0

c INIT for k = 143
c    -b^{143, 1}_2
c    -b^{143, 1}_1
c    -b^{143, 1}_0
c  in DIMACS:
-20684 0
-20685 0
-20686 0

c Transitions for k = 143
c i = 1
c  -2+1 --> -1
c    ( b^{143, 1}_2 ∧  b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧  p_143) -> ( b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0)
c  in CNF:
c    -b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨  b^{143, 2}_2
c    -b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_1
c    -b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨  b^{143, 2}_0
c  in DIMACS:
-20684 -20685  20686 -143  20687 0
-20684 -20685  20686 -143 -20688 0
-20684 -20685  20686 -143  20689 0

c  -1+1 --> 0
c    ( b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧  b^{143, 1}_0 ∧  p_143) -> (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧ -b^{143, 2}_0)
c  in CNF:
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_2
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_1
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_0
c  in DIMACS:
-20684  20685 -20686 -143 -20687 0
-20684  20685 -20686 -143 -20688 0
-20684  20685 -20686 -143 -20689 0

c  0+1 --> 1
c    (-b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧  p_143) -> (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0)
c  in CNF:
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_2
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_1
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨  b^{143, 2}_0
c  in DIMACS:
 20684  20685  20686 -143 -20687 0
 20684  20685  20686 -143 -20688 0
 20684  20685  20686 -143  20689 0

c  1+1 --> 2
c    (-b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧  b^{143, 1}_0 ∧  p_143) -> (-b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0)
c  in CNF:
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_2
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨  b^{143, 2}_1
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ -p_143 ∨ -b^{143, 2}_0
c  in DIMACS:
 20684  20685 -20686 -143 -20687 0
 20684  20685 -20686 -143  20688 0
 20684  20685 -20686 -143 -20689 0

c  2+1 --> break 
c    (-b^{143, 1}_2 ∧  b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧  p_143) -> break
c  in CNF:
c     b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ -p_143 ∨ break
c  in DIMACS:
 20684 -20685  20686 -143 1162 0


c  2-1 --> 1
c    (-b^{143, 1}_2 ∧  b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧ -p_143) -> (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0)
c  in CNF:
c     b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_2
c     b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_1
c     b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨  b^{143, 2}_0
c  in DIMACS:
 20684 -20685  20686  143 -20687 0
 20684 -20685  20686  143 -20688 0
 20684 -20685  20686  143  20689 0

c  1-1 --> 0
c    (-b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧  b^{143, 1}_0 ∧ -p_143) -> (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧ -b^{143, 2}_0)
c  in CNF:
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_2
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_1
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_0
c  in DIMACS:
 20684  20685 -20686  143 -20687 0
 20684  20685 -20686  143 -20688 0
 20684  20685 -20686  143 -20689 0

c  0-1 --> -1
c    (-b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧ -p_143) -> ( b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0)
c  in CNF:
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨  b^{143, 2}_2
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_1
c     b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨  b^{143, 2}_0
c  in DIMACS:
 20684  20685  20686  143  20687 0
 20684  20685  20686  143 -20688 0
 20684  20685  20686  143  20689 0

c  -1-1 --> -2
c    ( b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧  b^{143, 1}_0 ∧ -p_143) -> ( b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0)
c  in CNF:
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨  b^{143, 2}_2
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨  b^{143, 2}_1
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨  p_143 ∨ -b^{143, 2}_0
c  in DIMACS:
-20684  20685 -20686  143  20687 0
-20684  20685 -20686  143  20688 0
-20684  20685 -20686  143 -20689 0

c  -2-1 --> break 
c    ( b^{143, 1}_2 ∧  b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧ -p_143) -> break
c  in CNF:
c    -b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨  b^{143, 1}_0 ∨  p_143 ∨ break
c  in DIMACS:
-20684 -20685  20686  143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 1}_2 ∧ -b^{143, 1}_1 ∧ -b^{143, 1}_0 ∧ true) 
c  in CNF:
c    -b^{143, 1}_2 ∨  b^{143, 1}_1 ∨  b^{143, 1}_0 ∨ false 
c  in DIMACS:
-20684  20685  20686  0

c  3 does not represent an automaton state.
c    -(-b^{143, 1}_2 ∧  b^{143, 1}_1 ∧  b^{143, 1}_0 ∧ true) 
c  in CNF:
c     b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ false 
c  in DIMACS:
 20684 -20685 -20686  0
c  -3 does not represent an automaton state.
c    -( b^{143, 1}_2 ∧  b^{143, 1}_1 ∧  b^{143, 1}_0 ∧ true) 
c  in CNF:
c    -b^{143, 1}_2 ∨ -b^{143, 1}_1 ∨ -b^{143, 1}_0 ∨ false 
c  in DIMACS:
-20684 -20685 -20686  0

c i = 2
c  -2+1 --> -1
c    ( b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧  p_286) -> ( b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0)
c  in CNF:
c    -b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨  b^{143, 3}_2
c    -b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_1
c    -b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨  b^{143, 3}_0
c  in DIMACS:
-20687 -20688  20689 -286  20690 0
-20687 -20688  20689 -286 -20691 0
-20687 -20688  20689 -286  20692 0

c  -1+1 --> 0
c    ( b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0 ∧  p_286) -> (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧ -b^{143, 3}_0)
c  in CNF:
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_2
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_1
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_0
c  in DIMACS:
-20687  20688 -20689 -286 -20690 0
-20687  20688 -20689 -286 -20691 0
-20687  20688 -20689 -286 -20692 0

c  0+1 --> 1
c    (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧  p_286) -> (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0)
c  in CNF:
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_2
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_1
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨  b^{143, 3}_0
c  in DIMACS:
 20687  20688  20689 -286 -20690 0
 20687  20688  20689 -286 -20691 0
 20687  20688  20689 -286  20692 0

c  1+1 --> 2
c    (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0 ∧  p_286) -> (-b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0)
c  in CNF:
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_2
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨  b^{143, 3}_1
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ -p_286 ∨ -b^{143, 3}_0
c  in DIMACS:
 20687  20688 -20689 -286 -20690 0
 20687  20688 -20689 -286  20691 0
 20687  20688 -20689 -286 -20692 0

c  2+1 --> break 
c    (-b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧  p_286) -> break
c  in CNF:
c     b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 20687 -20688  20689 -286 1162 0


c  2-1 --> 1
c    (-b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧ -p_286) -> (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0)
c  in CNF:
c     b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_2
c     b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_1
c     b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨  b^{143, 3}_0
c  in DIMACS:
 20687 -20688  20689  286 -20690 0
 20687 -20688  20689  286 -20691 0
 20687 -20688  20689  286  20692 0

c  1-1 --> 0
c    (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0 ∧ -p_286) -> (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧ -b^{143, 3}_0)
c  in CNF:
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_2
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_1
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_0
c  in DIMACS:
 20687  20688 -20689  286 -20690 0
 20687  20688 -20689  286 -20691 0
 20687  20688 -20689  286 -20692 0

c  0-1 --> -1
c    (-b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧ -p_286) -> ( b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0)
c  in CNF:
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨  b^{143, 3}_2
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_1
c     b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨  b^{143, 3}_0
c  in DIMACS:
 20687  20688  20689  286  20690 0
 20687  20688  20689  286 -20691 0
 20687  20688  20689  286  20692 0

c  -1-1 --> -2
c    ( b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧  b^{143, 2}_0 ∧ -p_286) -> ( b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0)
c  in CNF:
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨  b^{143, 3}_2
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨  b^{143, 3}_1
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨  p_286 ∨ -b^{143, 3}_0
c  in DIMACS:
-20687  20688 -20689  286  20690 0
-20687  20688 -20689  286  20691 0
-20687  20688 -20689  286 -20692 0

c  -2-1 --> break 
c    ( b^{143, 2}_2 ∧  b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨  b^{143, 2}_0 ∨  p_286 ∨ break
c  in DIMACS:
-20687 -20688  20689  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 2}_2 ∧ -b^{143, 2}_1 ∧ -b^{143, 2}_0 ∧ true) 
c  in CNF:
c    -b^{143, 2}_2 ∨  b^{143, 2}_1 ∨  b^{143, 2}_0 ∨ false 
c  in DIMACS:
-20687  20688  20689  0

c  3 does not represent an automaton state.
c    -(-b^{143, 2}_2 ∧  b^{143, 2}_1 ∧  b^{143, 2}_0 ∧ true) 
c  in CNF:
c     b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ false 
c  in DIMACS:
 20687 -20688 -20689  0
c  -3 does not represent an automaton state.
c    -( b^{143, 2}_2 ∧  b^{143, 2}_1 ∧  b^{143, 2}_0 ∧ true) 
c  in CNF:
c    -b^{143, 2}_2 ∨ -b^{143, 2}_1 ∨ -b^{143, 2}_0 ∨ false 
c  in DIMACS:
-20687 -20688 -20689  0

c i = 3
c  -2+1 --> -1
c    ( b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧  p_429) -> ( b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0)
c  in CNF:
c    -b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨  b^{143, 4}_2
c    -b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_1
c    -b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨  b^{143, 4}_0
c  in DIMACS:
-20690 -20691  20692 -429  20693 0
-20690 -20691  20692 -429 -20694 0
-20690 -20691  20692 -429  20695 0

c  -1+1 --> 0
c    ( b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0 ∧  p_429) -> (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧ -b^{143, 4}_0)
c  in CNF:
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_2
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_1
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_0
c  in DIMACS:
-20690  20691 -20692 -429 -20693 0
-20690  20691 -20692 -429 -20694 0
-20690  20691 -20692 -429 -20695 0

c  0+1 --> 1
c    (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧  p_429) -> (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0)
c  in CNF:
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_2
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_1
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨  b^{143, 4}_0
c  in DIMACS:
 20690  20691  20692 -429 -20693 0
 20690  20691  20692 -429 -20694 0
 20690  20691  20692 -429  20695 0

c  1+1 --> 2
c    (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0 ∧  p_429) -> (-b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0)
c  in CNF:
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_2
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨  b^{143, 4}_1
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ -p_429 ∨ -b^{143, 4}_0
c  in DIMACS:
 20690  20691 -20692 -429 -20693 0
 20690  20691 -20692 -429  20694 0
 20690  20691 -20692 -429 -20695 0

c  2+1 --> break 
c    (-b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧  p_429) -> break
c  in CNF:
c     b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ -p_429 ∨ break
c  in DIMACS:
 20690 -20691  20692 -429 1162 0


c  2-1 --> 1
c    (-b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧ -p_429) -> (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0)
c  in CNF:
c     b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_2
c     b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_1
c     b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨  b^{143, 4}_0
c  in DIMACS:
 20690 -20691  20692  429 -20693 0
 20690 -20691  20692  429 -20694 0
 20690 -20691  20692  429  20695 0

c  1-1 --> 0
c    (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0 ∧ -p_429) -> (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧ -b^{143, 4}_0)
c  in CNF:
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_2
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_1
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_0
c  in DIMACS:
 20690  20691 -20692  429 -20693 0
 20690  20691 -20692  429 -20694 0
 20690  20691 -20692  429 -20695 0

c  0-1 --> -1
c    (-b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧ -p_429) -> ( b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0)
c  in CNF:
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨  b^{143, 4}_2
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_1
c     b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨  b^{143, 4}_0
c  in DIMACS:
 20690  20691  20692  429  20693 0
 20690  20691  20692  429 -20694 0
 20690  20691  20692  429  20695 0

c  -1-1 --> -2
c    ( b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧  b^{143, 3}_0 ∧ -p_429) -> ( b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0)
c  in CNF:
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨  b^{143, 4}_2
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨  b^{143, 4}_1
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨  p_429 ∨ -b^{143, 4}_0
c  in DIMACS:
-20690  20691 -20692  429  20693 0
-20690  20691 -20692  429  20694 0
-20690  20691 -20692  429 -20695 0

c  -2-1 --> break 
c    ( b^{143, 3}_2 ∧  b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧ -p_429) -> break
c  in CNF:
c    -b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨  b^{143, 3}_0 ∨  p_429 ∨ break
c  in DIMACS:
-20690 -20691  20692  429 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 3}_2 ∧ -b^{143, 3}_1 ∧ -b^{143, 3}_0 ∧ true) 
c  in CNF:
c    -b^{143, 3}_2 ∨  b^{143, 3}_1 ∨  b^{143, 3}_0 ∨ false 
c  in DIMACS:
-20690  20691  20692  0

c  3 does not represent an automaton state.
c    -(-b^{143, 3}_2 ∧  b^{143, 3}_1 ∧  b^{143, 3}_0 ∧ true) 
c  in CNF:
c     b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ false 
c  in DIMACS:
 20690 -20691 -20692  0
c  -3 does not represent an automaton state.
c    -( b^{143, 3}_2 ∧  b^{143, 3}_1 ∧  b^{143, 3}_0 ∧ true) 
c  in CNF:
c    -b^{143, 3}_2 ∨ -b^{143, 3}_1 ∨ -b^{143, 3}_0 ∨ false 
c  in DIMACS:
-20690 -20691 -20692  0

c i = 4
c  -2+1 --> -1
c    ( b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧  p_572) -> ( b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0)
c  in CNF:
c    -b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨  b^{143, 5}_2
c    -b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_1
c    -b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨  b^{143, 5}_0
c  in DIMACS:
-20693 -20694  20695 -572  20696 0
-20693 -20694  20695 -572 -20697 0
-20693 -20694  20695 -572  20698 0

c  -1+1 --> 0
c    ( b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0 ∧  p_572) -> (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧ -b^{143, 5}_0)
c  in CNF:
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_2
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_1
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_0
c  in DIMACS:
-20693  20694 -20695 -572 -20696 0
-20693  20694 -20695 -572 -20697 0
-20693  20694 -20695 -572 -20698 0

c  0+1 --> 1
c    (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧  p_572) -> (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0)
c  in CNF:
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_2
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_1
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨  b^{143, 5}_0
c  in DIMACS:
 20693  20694  20695 -572 -20696 0
 20693  20694  20695 -572 -20697 0
 20693  20694  20695 -572  20698 0

c  1+1 --> 2
c    (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0 ∧  p_572) -> (-b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0)
c  in CNF:
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_2
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨  b^{143, 5}_1
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ -p_572 ∨ -b^{143, 5}_0
c  in DIMACS:
 20693  20694 -20695 -572 -20696 0
 20693  20694 -20695 -572  20697 0
 20693  20694 -20695 -572 -20698 0

c  2+1 --> break 
c    (-b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧  p_572) -> break
c  in CNF:
c     b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 20693 -20694  20695 -572 1162 0


c  2-1 --> 1
c    (-b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧ -p_572) -> (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0)
c  in CNF:
c     b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_2
c     b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_1
c     b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨  b^{143, 5}_0
c  in DIMACS:
 20693 -20694  20695  572 -20696 0
 20693 -20694  20695  572 -20697 0
 20693 -20694  20695  572  20698 0

c  1-1 --> 0
c    (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0 ∧ -p_572) -> (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧ -b^{143, 5}_0)
c  in CNF:
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_2
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_1
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_0
c  in DIMACS:
 20693  20694 -20695  572 -20696 0
 20693  20694 -20695  572 -20697 0
 20693  20694 -20695  572 -20698 0

c  0-1 --> -1
c    (-b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧ -p_572) -> ( b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0)
c  in CNF:
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨  b^{143, 5}_2
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_1
c     b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨  b^{143, 5}_0
c  in DIMACS:
 20693  20694  20695  572  20696 0
 20693  20694  20695  572 -20697 0
 20693  20694  20695  572  20698 0

c  -1-1 --> -2
c    ( b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧  b^{143, 4}_0 ∧ -p_572) -> ( b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0)
c  in CNF:
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨  b^{143, 5}_2
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨  b^{143, 5}_1
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨  p_572 ∨ -b^{143, 5}_0
c  in DIMACS:
-20693  20694 -20695  572  20696 0
-20693  20694 -20695  572  20697 0
-20693  20694 -20695  572 -20698 0

c  -2-1 --> break 
c    ( b^{143, 4}_2 ∧  b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨  b^{143, 4}_0 ∨  p_572 ∨ break
c  in DIMACS:
-20693 -20694  20695  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 4}_2 ∧ -b^{143, 4}_1 ∧ -b^{143, 4}_0 ∧ true) 
c  in CNF:
c    -b^{143, 4}_2 ∨  b^{143, 4}_1 ∨  b^{143, 4}_0 ∨ false 
c  in DIMACS:
-20693  20694  20695  0

c  3 does not represent an automaton state.
c    -(-b^{143, 4}_2 ∧  b^{143, 4}_1 ∧  b^{143, 4}_0 ∧ true) 
c  in CNF:
c     b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ false 
c  in DIMACS:
 20693 -20694 -20695  0
c  -3 does not represent an automaton state.
c    -( b^{143, 4}_2 ∧  b^{143, 4}_1 ∧  b^{143, 4}_0 ∧ true) 
c  in CNF:
c    -b^{143, 4}_2 ∨ -b^{143, 4}_1 ∨ -b^{143, 4}_0 ∨ false 
c  in DIMACS:
-20693 -20694 -20695  0

c i = 5
c  -2+1 --> -1
c    ( b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧  p_715) -> ( b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0)
c  in CNF:
c    -b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨  b^{143, 6}_2
c    -b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_1
c    -b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨  b^{143, 6}_0
c  in DIMACS:
-20696 -20697  20698 -715  20699 0
-20696 -20697  20698 -715 -20700 0
-20696 -20697  20698 -715  20701 0

c  -1+1 --> 0
c    ( b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0 ∧  p_715) -> (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧ -b^{143, 6}_0)
c  in CNF:
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_2
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_1
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_0
c  in DIMACS:
-20696  20697 -20698 -715 -20699 0
-20696  20697 -20698 -715 -20700 0
-20696  20697 -20698 -715 -20701 0

c  0+1 --> 1
c    (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧  p_715) -> (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0)
c  in CNF:
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_2
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_1
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨  b^{143, 6}_0
c  in DIMACS:
 20696  20697  20698 -715 -20699 0
 20696  20697  20698 -715 -20700 0
 20696  20697  20698 -715  20701 0

c  1+1 --> 2
c    (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0 ∧  p_715) -> (-b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0)
c  in CNF:
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_2
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨  b^{143, 6}_1
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ -p_715 ∨ -b^{143, 6}_0
c  in DIMACS:
 20696  20697 -20698 -715 -20699 0
 20696  20697 -20698 -715  20700 0
 20696  20697 -20698 -715 -20701 0

c  2+1 --> break 
c    (-b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧  p_715) -> break
c  in CNF:
c     b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ -p_715 ∨ break
c  in DIMACS:
 20696 -20697  20698 -715 1162 0


c  2-1 --> 1
c    (-b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧ -p_715) -> (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0)
c  in CNF:
c     b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_2
c     b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_1
c     b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨  b^{143, 6}_0
c  in DIMACS:
 20696 -20697  20698  715 -20699 0
 20696 -20697  20698  715 -20700 0
 20696 -20697  20698  715  20701 0

c  1-1 --> 0
c    (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0 ∧ -p_715) -> (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧ -b^{143, 6}_0)
c  in CNF:
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_2
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_1
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_0
c  in DIMACS:
 20696  20697 -20698  715 -20699 0
 20696  20697 -20698  715 -20700 0
 20696  20697 -20698  715 -20701 0

c  0-1 --> -1
c    (-b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧ -p_715) -> ( b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0)
c  in CNF:
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨  b^{143, 6}_2
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_1
c     b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨  b^{143, 6}_0
c  in DIMACS:
 20696  20697  20698  715  20699 0
 20696  20697  20698  715 -20700 0
 20696  20697  20698  715  20701 0

c  -1-1 --> -2
c    ( b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧  b^{143, 5}_0 ∧ -p_715) -> ( b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0)
c  in CNF:
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨  b^{143, 6}_2
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨  b^{143, 6}_1
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨  p_715 ∨ -b^{143, 6}_0
c  in DIMACS:
-20696  20697 -20698  715  20699 0
-20696  20697 -20698  715  20700 0
-20696  20697 -20698  715 -20701 0

c  -2-1 --> break 
c    ( b^{143, 5}_2 ∧  b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧ -p_715) -> break
c  in CNF:
c    -b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨  b^{143, 5}_0 ∨  p_715 ∨ break
c  in DIMACS:
-20696 -20697  20698  715 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 5}_2 ∧ -b^{143, 5}_1 ∧ -b^{143, 5}_0 ∧ true) 
c  in CNF:
c    -b^{143, 5}_2 ∨  b^{143, 5}_1 ∨  b^{143, 5}_0 ∨ false 
c  in DIMACS:
-20696  20697  20698  0

c  3 does not represent an automaton state.
c    -(-b^{143, 5}_2 ∧  b^{143, 5}_1 ∧  b^{143, 5}_0 ∧ true) 
c  in CNF:
c     b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ false 
c  in DIMACS:
 20696 -20697 -20698  0
c  -3 does not represent an automaton state.
c    -( b^{143, 5}_2 ∧  b^{143, 5}_1 ∧  b^{143, 5}_0 ∧ true) 
c  in CNF:
c    -b^{143, 5}_2 ∨ -b^{143, 5}_1 ∨ -b^{143, 5}_0 ∨ false 
c  in DIMACS:
-20696 -20697 -20698  0

c i = 6
c  -2+1 --> -1
c    ( b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧  p_858) -> ( b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0)
c  in CNF:
c    -b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨  b^{143, 7}_2
c    -b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_1
c    -b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨  b^{143, 7}_0
c  in DIMACS:
-20699 -20700  20701 -858  20702 0
-20699 -20700  20701 -858 -20703 0
-20699 -20700  20701 -858  20704 0

c  -1+1 --> 0
c    ( b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0 ∧  p_858) -> (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧ -b^{143, 7}_0)
c  in CNF:
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_2
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_1
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_0
c  in DIMACS:
-20699  20700 -20701 -858 -20702 0
-20699  20700 -20701 -858 -20703 0
-20699  20700 -20701 -858 -20704 0

c  0+1 --> 1
c    (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧  p_858) -> (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0)
c  in CNF:
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_2
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_1
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨  b^{143, 7}_0
c  in DIMACS:
 20699  20700  20701 -858 -20702 0
 20699  20700  20701 -858 -20703 0
 20699  20700  20701 -858  20704 0

c  1+1 --> 2
c    (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0 ∧  p_858) -> (-b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0)
c  in CNF:
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_2
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨  b^{143, 7}_1
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ -p_858 ∨ -b^{143, 7}_0
c  in DIMACS:
 20699  20700 -20701 -858 -20702 0
 20699  20700 -20701 -858  20703 0
 20699  20700 -20701 -858 -20704 0

c  2+1 --> break 
c    (-b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧  p_858) -> break
c  in CNF:
c     b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 20699 -20700  20701 -858 1162 0


c  2-1 --> 1
c    (-b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧ -p_858) -> (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0)
c  in CNF:
c     b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_2
c     b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_1
c     b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨  b^{143, 7}_0
c  in DIMACS:
 20699 -20700  20701  858 -20702 0
 20699 -20700  20701  858 -20703 0
 20699 -20700  20701  858  20704 0

c  1-1 --> 0
c    (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0 ∧ -p_858) -> (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧ -b^{143, 7}_0)
c  in CNF:
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_2
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_1
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_0
c  in DIMACS:
 20699  20700 -20701  858 -20702 0
 20699  20700 -20701  858 -20703 0
 20699  20700 -20701  858 -20704 0

c  0-1 --> -1
c    (-b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧ -p_858) -> ( b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0)
c  in CNF:
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨  b^{143, 7}_2
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_1
c     b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨  b^{143, 7}_0
c  in DIMACS:
 20699  20700  20701  858  20702 0
 20699  20700  20701  858 -20703 0
 20699  20700  20701  858  20704 0

c  -1-1 --> -2
c    ( b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧  b^{143, 6}_0 ∧ -p_858) -> ( b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0)
c  in CNF:
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨  b^{143, 7}_2
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨  b^{143, 7}_1
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨  p_858 ∨ -b^{143, 7}_0
c  in DIMACS:
-20699  20700 -20701  858  20702 0
-20699  20700 -20701  858  20703 0
-20699  20700 -20701  858 -20704 0

c  -2-1 --> break 
c    ( b^{143, 6}_2 ∧  b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨  b^{143, 6}_0 ∨  p_858 ∨ break
c  in DIMACS:
-20699 -20700  20701  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 6}_2 ∧ -b^{143, 6}_1 ∧ -b^{143, 6}_0 ∧ true) 
c  in CNF:
c    -b^{143, 6}_2 ∨  b^{143, 6}_1 ∨  b^{143, 6}_0 ∨ false 
c  in DIMACS:
-20699  20700  20701  0

c  3 does not represent an automaton state.
c    -(-b^{143, 6}_2 ∧  b^{143, 6}_1 ∧  b^{143, 6}_0 ∧ true) 
c  in CNF:
c     b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ false 
c  in DIMACS:
 20699 -20700 -20701  0
c  -3 does not represent an automaton state.
c    -( b^{143, 6}_2 ∧  b^{143, 6}_1 ∧  b^{143, 6}_0 ∧ true) 
c  in CNF:
c    -b^{143, 6}_2 ∨ -b^{143, 6}_1 ∨ -b^{143, 6}_0 ∨ false 
c  in DIMACS:
-20699 -20700 -20701  0

c i = 7
c  -2+1 --> -1
c    ( b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧  p_1001) -> ( b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0)
c  in CNF:
c    -b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨  b^{143, 8}_2
c    -b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_1
c    -b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨  b^{143, 8}_0
c  in DIMACS:
-20702 -20703  20704 -1001  20705 0
-20702 -20703  20704 -1001 -20706 0
-20702 -20703  20704 -1001  20707 0

c  -1+1 --> 0
c    ( b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0 ∧  p_1001) -> (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧ -b^{143, 8}_0)
c  in CNF:
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_2
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_1
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_0
c  in DIMACS:
-20702  20703 -20704 -1001 -20705 0
-20702  20703 -20704 -1001 -20706 0
-20702  20703 -20704 -1001 -20707 0

c  0+1 --> 1
c    (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧  p_1001) -> (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0)
c  in CNF:
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_2
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_1
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨  b^{143, 8}_0
c  in DIMACS:
 20702  20703  20704 -1001 -20705 0
 20702  20703  20704 -1001 -20706 0
 20702  20703  20704 -1001  20707 0

c  1+1 --> 2
c    (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0 ∧  p_1001) -> (-b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0)
c  in CNF:
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_2
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨  b^{143, 8}_1
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ -p_1001 ∨ -b^{143, 8}_0
c  in DIMACS:
 20702  20703 -20704 -1001 -20705 0
 20702  20703 -20704 -1001  20706 0
 20702  20703 -20704 -1001 -20707 0

c  2+1 --> break 
c    (-b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧  p_1001) -> break
c  in CNF:
c     b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ -p_1001 ∨ break
c  in DIMACS:
 20702 -20703  20704 -1001 1162 0


c  2-1 --> 1
c    (-b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧ -p_1001) -> (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0)
c  in CNF:
c     b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_2
c     b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_1
c     b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨  b^{143, 8}_0
c  in DIMACS:
 20702 -20703  20704  1001 -20705 0
 20702 -20703  20704  1001 -20706 0
 20702 -20703  20704  1001  20707 0

c  1-1 --> 0
c    (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0 ∧ -p_1001) -> (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧ -b^{143, 8}_0)
c  in CNF:
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_2
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_1
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_0
c  in DIMACS:
 20702  20703 -20704  1001 -20705 0
 20702  20703 -20704  1001 -20706 0
 20702  20703 -20704  1001 -20707 0

c  0-1 --> -1
c    (-b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧ -p_1001) -> ( b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0)
c  in CNF:
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨  b^{143, 8}_2
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_1
c     b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨  b^{143, 8}_0
c  in DIMACS:
 20702  20703  20704  1001  20705 0
 20702  20703  20704  1001 -20706 0
 20702  20703  20704  1001  20707 0

c  -1-1 --> -2
c    ( b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧  b^{143, 7}_0 ∧ -p_1001) -> ( b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0)
c  in CNF:
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨  b^{143, 8}_2
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨  b^{143, 8}_1
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨  p_1001 ∨ -b^{143, 8}_0
c  in DIMACS:
-20702  20703 -20704  1001  20705 0
-20702  20703 -20704  1001  20706 0
-20702  20703 -20704  1001 -20707 0

c  -2-1 --> break 
c    ( b^{143, 7}_2 ∧  b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧ -p_1001) -> break
c  in CNF:
c    -b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨  b^{143, 7}_0 ∨  p_1001 ∨ break
c  in DIMACS:
-20702 -20703  20704  1001 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 7}_2 ∧ -b^{143, 7}_1 ∧ -b^{143, 7}_0 ∧ true) 
c  in CNF:
c    -b^{143, 7}_2 ∨  b^{143, 7}_1 ∨  b^{143, 7}_0 ∨ false 
c  in DIMACS:
-20702  20703  20704  0

c  3 does not represent an automaton state.
c    -(-b^{143, 7}_2 ∧  b^{143, 7}_1 ∧  b^{143, 7}_0 ∧ true) 
c  in CNF:
c     b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ false 
c  in DIMACS:
 20702 -20703 -20704  0
c  -3 does not represent an automaton state.
c    -( b^{143, 7}_2 ∧  b^{143, 7}_1 ∧  b^{143, 7}_0 ∧ true) 
c  in CNF:
c    -b^{143, 7}_2 ∨ -b^{143, 7}_1 ∨ -b^{143, 7}_0 ∨ false 
c  in DIMACS:
-20702 -20703 -20704  0

c i = 8
c  -2+1 --> -1
c    ( b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧  p_1144) -> ( b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧  b^{143, 9}_0)
c  in CNF:
c    -b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨  b^{143, 9}_2
c    -b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_1
c    -b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨  b^{143, 9}_0
c  in DIMACS:
-20705 -20706  20707 -1144  20708 0
-20705 -20706  20707 -1144 -20709 0
-20705 -20706  20707 -1144  20710 0

c  -1+1 --> 0
c    ( b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0 ∧  p_1144) -> (-b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧ -b^{143, 9}_0)
c  in CNF:
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_2
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_1
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_0
c  in DIMACS:
-20705  20706 -20707 -1144 -20708 0
-20705  20706 -20707 -1144 -20709 0
-20705  20706 -20707 -1144 -20710 0

c  0+1 --> 1
c    (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧  p_1144) -> (-b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧  b^{143, 9}_0)
c  in CNF:
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_2
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_1
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨  b^{143, 9}_0
c  in DIMACS:
 20705  20706  20707 -1144 -20708 0
 20705  20706  20707 -1144 -20709 0
 20705  20706  20707 -1144  20710 0

c  1+1 --> 2
c    (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0 ∧  p_1144) -> (-b^{143, 9}_2 ∧  b^{143, 9}_1 ∧ -b^{143, 9}_0)
c  in CNF:
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_2
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨  b^{143, 9}_1
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ -p_1144 ∨ -b^{143, 9}_0
c  in DIMACS:
 20705  20706 -20707 -1144 -20708 0
 20705  20706 -20707 -1144  20709 0
 20705  20706 -20707 -1144 -20710 0

c  2+1 --> break 
c    (-b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 20705 -20706  20707 -1144 1162 0


c  2-1 --> 1
c    (-b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧ -p_1144) -> (-b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧  b^{143, 9}_0)
c  in CNF:
c     b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_2
c     b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_1
c     b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨  b^{143, 9}_0
c  in DIMACS:
 20705 -20706  20707  1144 -20708 0
 20705 -20706  20707  1144 -20709 0
 20705 -20706  20707  1144  20710 0

c  1-1 --> 0
c    (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0 ∧ -p_1144) -> (-b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧ -b^{143, 9}_0)
c  in CNF:
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_2
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_1
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_0
c  in DIMACS:
 20705  20706 -20707  1144 -20708 0
 20705  20706 -20707  1144 -20709 0
 20705  20706 -20707  1144 -20710 0

c  0-1 --> -1
c    (-b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧ -p_1144) -> ( b^{143, 9}_2 ∧ -b^{143, 9}_1 ∧  b^{143, 9}_0)
c  in CNF:
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨  b^{143, 9}_2
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_1
c     b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨  b^{143, 9}_0
c  in DIMACS:
 20705  20706  20707  1144  20708 0
 20705  20706  20707  1144 -20709 0
 20705  20706  20707  1144  20710 0

c  -1-1 --> -2
c    ( b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧  b^{143, 8}_0 ∧ -p_1144) -> ( b^{143, 9}_2 ∧  b^{143, 9}_1 ∧ -b^{143, 9}_0)
c  in CNF:
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨  b^{143, 9}_2
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨  b^{143, 9}_1
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨  p_1144 ∨ -b^{143, 9}_0
c  in DIMACS:
-20705  20706 -20707  1144  20708 0
-20705  20706 -20707  1144  20709 0
-20705  20706 -20707  1144 -20710 0

c  -2-1 --> break 
c    ( b^{143, 8}_2 ∧  b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨  b^{143, 8}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-20705 -20706  20707  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{143, 8}_2 ∧ -b^{143, 8}_1 ∧ -b^{143, 8}_0 ∧ true) 
c  in CNF:
c    -b^{143, 8}_2 ∨  b^{143, 8}_1 ∨  b^{143, 8}_0 ∨ false 
c  in DIMACS:
-20705  20706  20707  0

c  3 does not represent an automaton state.
c    -(-b^{143, 8}_2 ∧  b^{143, 8}_1 ∧  b^{143, 8}_0 ∧ true) 
c  in CNF:
c     b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ false 
c  in DIMACS:
 20705 -20706 -20707  0
c  -3 does not represent an automaton state.
c    -( b^{143, 8}_2 ∧  b^{143, 8}_1 ∧  b^{143, 8}_0 ∧ true) 
c  in CNF:
c    -b^{143, 8}_2 ∨ -b^{143, 8}_1 ∨ -b^{143, 8}_0 ∨ false 
c  in DIMACS:
-20705 -20706 -20707  0

c INIT for k = 144
c    -b^{144, 1}_2
c    -b^{144, 1}_1
c    -b^{144, 1}_0
c  in DIMACS:
-20711 0
-20712 0
-20713 0

c Transitions for k = 144
c i = 1
c  -2+1 --> -1
c    ( b^{144, 1}_2 ∧  b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧  p_144) -> ( b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0)
c  in CNF:
c    -b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨  b^{144, 2}_2
c    -b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_1
c    -b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨  b^{144, 2}_0
c  in DIMACS:
-20711 -20712  20713 -144  20714 0
-20711 -20712  20713 -144 -20715 0
-20711 -20712  20713 -144  20716 0

c  -1+1 --> 0
c    ( b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧  b^{144, 1}_0 ∧  p_144) -> (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧ -b^{144, 2}_0)
c  in CNF:
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_2
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_1
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_0
c  in DIMACS:
-20711  20712 -20713 -144 -20714 0
-20711  20712 -20713 -144 -20715 0
-20711  20712 -20713 -144 -20716 0

c  0+1 --> 1
c    (-b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧  p_144) -> (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0)
c  in CNF:
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_2
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_1
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨  b^{144, 2}_0
c  in DIMACS:
 20711  20712  20713 -144 -20714 0
 20711  20712  20713 -144 -20715 0
 20711  20712  20713 -144  20716 0

c  1+1 --> 2
c    (-b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧  b^{144, 1}_0 ∧  p_144) -> (-b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0)
c  in CNF:
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_2
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨  b^{144, 2}_1
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ -p_144 ∨ -b^{144, 2}_0
c  in DIMACS:
 20711  20712 -20713 -144 -20714 0
 20711  20712 -20713 -144  20715 0
 20711  20712 -20713 -144 -20716 0

c  2+1 --> break 
c    (-b^{144, 1}_2 ∧  b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧  p_144) -> break
c  in CNF:
c     b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ -p_144 ∨ break
c  in DIMACS:
 20711 -20712  20713 -144 1162 0


c  2-1 --> 1
c    (-b^{144, 1}_2 ∧  b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧ -p_144) -> (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0)
c  in CNF:
c     b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_2
c     b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_1
c     b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨  b^{144, 2}_0
c  in DIMACS:
 20711 -20712  20713  144 -20714 0
 20711 -20712  20713  144 -20715 0
 20711 -20712  20713  144  20716 0

c  1-1 --> 0
c    (-b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧  b^{144, 1}_0 ∧ -p_144) -> (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧ -b^{144, 2}_0)
c  in CNF:
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_2
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_1
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_0
c  in DIMACS:
 20711  20712 -20713  144 -20714 0
 20711  20712 -20713  144 -20715 0
 20711  20712 -20713  144 -20716 0

c  0-1 --> -1
c    (-b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧ -p_144) -> ( b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0)
c  in CNF:
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨  b^{144, 2}_2
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_1
c     b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨  b^{144, 2}_0
c  in DIMACS:
 20711  20712  20713  144  20714 0
 20711  20712  20713  144 -20715 0
 20711  20712  20713  144  20716 0

c  -1-1 --> -2
c    ( b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧  b^{144, 1}_0 ∧ -p_144) -> ( b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0)
c  in CNF:
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨  b^{144, 2}_2
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨  b^{144, 2}_1
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨  p_144 ∨ -b^{144, 2}_0
c  in DIMACS:
-20711  20712 -20713  144  20714 0
-20711  20712 -20713  144  20715 0
-20711  20712 -20713  144 -20716 0

c  -2-1 --> break 
c    ( b^{144, 1}_2 ∧  b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧ -p_144) -> break
c  in CNF:
c    -b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨  b^{144, 1}_0 ∨  p_144 ∨ break
c  in DIMACS:
-20711 -20712  20713  144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 1}_2 ∧ -b^{144, 1}_1 ∧ -b^{144, 1}_0 ∧ true) 
c  in CNF:
c    -b^{144, 1}_2 ∨  b^{144, 1}_1 ∨  b^{144, 1}_0 ∨ false 
c  in DIMACS:
-20711  20712  20713  0

c  3 does not represent an automaton state.
c    -(-b^{144, 1}_2 ∧  b^{144, 1}_1 ∧  b^{144, 1}_0 ∧ true) 
c  in CNF:
c     b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ false 
c  in DIMACS:
 20711 -20712 -20713  0
c  -3 does not represent an automaton state.
c    -( b^{144, 1}_2 ∧  b^{144, 1}_1 ∧  b^{144, 1}_0 ∧ true) 
c  in CNF:
c    -b^{144, 1}_2 ∨ -b^{144, 1}_1 ∨ -b^{144, 1}_0 ∨ false 
c  in DIMACS:
-20711 -20712 -20713  0

c i = 2
c  -2+1 --> -1
c    ( b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧  p_288) -> ( b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0)
c  in CNF:
c    -b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨  b^{144, 3}_2
c    -b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_1
c    -b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨  b^{144, 3}_0
c  in DIMACS:
-20714 -20715  20716 -288  20717 0
-20714 -20715  20716 -288 -20718 0
-20714 -20715  20716 -288  20719 0

c  -1+1 --> 0
c    ( b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0 ∧  p_288) -> (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧ -b^{144, 3}_0)
c  in CNF:
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_2
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_1
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_0
c  in DIMACS:
-20714  20715 -20716 -288 -20717 0
-20714  20715 -20716 -288 -20718 0
-20714  20715 -20716 -288 -20719 0

c  0+1 --> 1
c    (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧  p_288) -> (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0)
c  in CNF:
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_2
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_1
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨  b^{144, 3}_0
c  in DIMACS:
 20714  20715  20716 -288 -20717 0
 20714  20715  20716 -288 -20718 0
 20714  20715  20716 -288  20719 0

c  1+1 --> 2
c    (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0 ∧  p_288) -> (-b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0)
c  in CNF:
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_2
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨  b^{144, 3}_1
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ -p_288 ∨ -b^{144, 3}_0
c  in DIMACS:
 20714  20715 -20716 -288 -20717 0
 20714  20715 -20716 -288  20718 0
 20714  20715 -20716 -288 -20719 0

c  2+1 --> break 
c    (-b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧  p_288) -> break
c  in CNF:
c     b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 20714 -20715  20716 -288 1162 0


c  2-1 --> 1
c    (-b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧ -p_288) -> (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0)
c  in CNF:
c     b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_2
c     b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_1
c     b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨  b^{144, 3}_0
c  in DIMACS:
 20714 -20715  20716  288 -20717 0
 20714 -20715  20716  288 -20718 0
 20714 -20715  20716  288  20719 0

c  1-1 --> 0
c    (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0 ∧ -p_288) -> (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧ -b^{144, 3}_0)
c  in CNF:
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_2
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_1
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_0
c  in DIMACS:
 20714  20715 -20716  288 -20717 0
 20714  20715 -20716  288 -20718 0
 20714  20715 -20716  288 -20719 0

c  0-1 --> -1
c    (-b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧ -p_288) -> ( b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0)
c  in CNF:
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨  b^{144, 3}_2
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_1
c     b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨  b^{144, 3}_0
c  in DIMACS:
 20714  20715  20716  288  20717 0
 20714  20715  20716  288 -20718 0
 20714  20715  20716  288  20719 0

c  -1-1 --> -2
c    ( b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧  b^{144, 2}_0 ∧ -p_288) -> ( b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0)
c  in CNF:
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨  b^{144, 3}_2
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨  b^{144, 3}_1
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨  p_288 ∨ -b^{144, 3}_0
c  in DIMACS:
-20714  20715 -20716  288  20717 0
-20714  20715 -20716  288  20718 0
-20714  20715 -20716  288 -20719 0

c  -2-1 --> break 
c    ( b^{144, 2}_2 ∧  b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨  b^{144, 2}_0 ∨  p_288 ∨ break
c  in DIMACS:
-20714 -20715  20716  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 2}_2 ∧ -b^{144, 2}_1 ∧ -b^{144, 2}_0 ∧ true) 
c  in CNF:
c    -b^{144, 2}_2 ∨  b^{144, 2}_1 ∨  b^{144, 2}_0 ∨ false 
c  in DIMACS:
-20714  20715  20716  0

c  3 does not represent an automaton state.
c    -(-b^{144, 2}_2 ∧  b^{144, 2}_1 ∧  b^{144, 2}_0 ∧ true) 
c  in CNF:
c     b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ false 
c  in DIMACS:
 20714 -20715 -20716  0
c  -3 does not represent an automaton state.
c    -( b^{144, 2}_2 ∧  b^{144, 2}_1 ∧  b^{144, 2}_0 ∧ true) 
c  in CNF:
c    -b^{144, 2}_2 ∨ -b^{144, 2}_1 ∨ -b^{144, 2}_0 ∨ false 
c  in DIMACS:
-20714 -20715 -20716  0

c i = 3
c  -2+1 --> -1
c    ( b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧  p_432) -> ( b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0)
c  in CNF:
c    -b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨  b^{144, 4}_2
c    -b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_1
c    -b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨  b^{144, 4}_0
c  in DIMACS:
-20717 -20718  20719 -432  20720 0
-20717 -20718  20719 -432 -20721 0
-20717 -20718  20719 -432  20722 0

c  -1+1 --> 0
c    ( b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0 ∧  p_432) -> (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧ -b^{144, 4}_0)
c  in CNF:
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_2
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_1
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_0
c  in DIMACS:
-20717  20718 -20719 -432 -20720 0
-20717  20718 -20719 -432 -20721 0
-20717  20718 -20719 -432 -20722 0

c  0+1 --> 1
c    (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧  p_432) -> (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0)
c  in CNF:
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_2
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_1
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨  b^{144, 4}_0
c  in DIMACS:
 20717  20718  20719 -432 -20720 0
 20717  20718  20719 -432 -20721 0
 20717  20718  20719 -432  20722 0

c  1+1 --> 2
c    (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0 ∧  p_432) -> (-b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0)
c  in CNF:
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_2
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨  b^{144, 4}_1
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ -p_432 ∨ -b^{144, 4}_0
c  in DIMACS:
 20717  20718 -20719 -432 -20720 0
 20717  20718 -20719 -432  20721 0
 20717  20718 -20719 -432 -20722 0

c  2+1 --> break 
c    (-b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧  p_432) -> break
c  in CNF:
c     b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 20717 -20718  20719 -432 1162 0


c  2-1 --> 1
c    (-b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧ -p_432) -> (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0)
c  in CNF:
c     b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_2
c     b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_1
c     b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨  b^{144, 4}_0
c  in DIMACS:
 20717 -20718  20719  432 -20720 0
 20717 -20718  20719  432 -20721 0
 20717 -20718  20719  432  20722 0

c  1-1 --> 0
c    (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0 ∧ -p_432) -> (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧ -b^{144, 4}_0)
c  in CNF:
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_2
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_1
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_0
c  in DIMACS:
 20717  20718 -20719  432 -20720 0
 20717  20718 -20719  432 -20721 0
 20717  20718 -20719  432 -20722 0

c  0-1 --> -1
c    (-b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧ -p_432) -> ( b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0)
c  in CNF:
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨  b^{144, 4}_2
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_1
c     b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨  b^{144, 4}_0
c  in DIMACS:
 20717  20718  20719  432  20720 0
 20717  20718  20719  432 -20721 0
 20717  20718  20719  432  20722 0

c  -1-1 --> -2
c    ( b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧  b^{144, 3}_0 ∧ -p_432) -> ( b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0)
c  in CNF:
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨  b^{144, 4}_2
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨  b^{144, 4}_1
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨  p_432 ∨ -b^{144, 4}_0
c  in DIMACS:
-20717  20718 -20719  432  20720 0
-20717  20718 -20719  432  20721 0
-20717  20718 -20719  432 -20722 0

c  -2-1 --> break 
c    ( b^{144, 3}_2 ∧  b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨  b^{144, 3}_0 ∨  p_432 ∨ break
c  in DIMACS:
-20717 -20718  20719  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 3}_2 ∧ -b^{144, 3}_1 ∧ -b^{144, 3}_0 ∧ true) 
c  in CNF:
c    -b^{144, 3}_2 ∨  b^{144, 3}_1 ∨  b^{144, 3}_0 ∨ false 
c  in DIMACS:
-20717  20718  20719  0

c  3 does not represent an automaton state.
c    -(-b^{144, 3}_2 ∧  b^{144, 3}_1 ∧  b^{144, 3}_0 ∧ true) 
c  in CNF:
c     b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ false 
c  in DIMACS:
 20717 -20718 -20719  0
c  -3 does not represent an automaton state.
c    -( b^{144, 3}_2 ∧  b^{144, 3}_1 ∧  b^{144, 3}_0 ∧ true) 
c  in CNF:
c    -b^{144, 3}_2 ∨ -b^{144, 3}_1 ∨ -b^{144, 3}_0 ∨ false 
c  in DIMACS:
-20717 -20718 -20719  0

c i = 4
c  -2+1 --> -1
c    ( b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧  p_576) -> ( b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0)
c  in CNF:
c    -b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨  b^{144, 5}_2
c    -b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_1
c    -b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨  b^{144, 5}_0
c  in DIMACS:
-20720 -20721  20722 -576  20723 0
-20720 -20721  20722 -576 -20724 0
-20720 -20721  20722 -576  20725 0

c  -1+1 --> 0
c    ( b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0 ∧  p_576) -> (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧ -b^{144, 5}_0)
c  in CNF:
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_2
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_1
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_0
c  in DIMACS:
-20720  20721 -20722 -576 -20723 0
-20720  20721 -20722 -576 -20724 0
-20720  20721 -20722 -576 -20725 0

c  0+1 --> 1
c    (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧  p_576) -> (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0)
c  in CNF:
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_2
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_1
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨  b^{144, 5}_0
c  in DIMACS:
 20720  20721  20722 -576 -20723 0
 20720  20721  20722 -576 -20724 0
 20720  20721  20722 -576  20725 0

c  1+1 --> 2
c    (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0 ∧  p_576) -> (-b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0)
c  in CNF:
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_2
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨  b^{144, 5}_1
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ -p_576 ∨ -b^{144, 5}_0
c  in DIMACS:
 20720  20721 -20722 -576 -20723 0
 20720  20721 -20722 -576  20724 0
 20720  20721 -20722 -576 -20725 0

c  2+1 --> break 
c    (-b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧  p_576) -> break
c  in CNF:
c     b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 20720 -20721  20722 -576 1162 0


c  2-1 --> 1
c    (-b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧ -p_576) -> (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0)
c  in CNF:
c     b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_2
c     b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_1
c     b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨  b^{144, 5}_0
c  in DIMACS:
 20720 -20721  20722  576 -20723 0
 20720 -20721  20722  576 -20724 0
 20720 -20721  20722  576  20725 0

c  1-1 --> 0
c    (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0 ∧ -p_576) -> (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧ -b^{144, 5}_0)
c  in CNF:
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_2
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_1
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_0
c  in DIMACS:
 20720  20721 -20722  576 -20723 0
 20720  20721 -20722  576 -20724 0
 20720  20721 -20722  576 -20725 0

c  0-1 --> -1
c    (-b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧ -p_576) -> ( b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0)
c  in CNF:
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨  b^{144, 5}_2
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_1
c     b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨  b^{144, 5}_0
c  in DIMACS:
 20720  20721  20722  576  20723 0
 20720  20721  20722  576 -20724 0
 20720  20721  20722  576  20725 0

c  -1-1 --> -2
c    ( b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧  b^{144, 4}_0 ∧ -p_576) -> ( b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0)
c  in CNF:
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨  b^{144, 5}_2
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨  b^{144, 5}_1
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨  p_576 ∨ -b^{144, 5}_0
c  in DIMACS:
-20720  20721 -20722  576  20723 0
-20720  20721 -20722  576  20724 0
-20720  20721 -20722  576 -20725 0

c  -2-1 --> break 
c    ( b^{144, 4}_2 ∧  b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨  b^{144, 4}_0 ∨  p_576 ∨ break
c  in DIMACS:
-20720 -20721  20722  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 4}_2 ∧ -b^{144, 4}_1 ∧ -b^{144, 4}_0 ∧ true) 
c  in CNF:
c    -b^{144, 4}_2 ∨  b^{144, 4}_1 ∨  b^{144, 4}_0 ∨ false 
c  in DIMACS:
-20720  20721  20722  0

c  3 does not represent an automaton state.
c    -(-b^{144, 4}_2 ∧  b^{144, 4}_1 ∧  b^{144, 4}_0 ∧ true) 
c  in CNF:
c     b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ false 
c  in DIMACS:
 20720 -20721 -20722  0
c  -3 does not represent an automaton state.
c    -( b^{144, 4}_2 ∧  b^{144, 4}_1 ∧  b^{144, 4}_0 ∧ true) 
c  in CNF:
c    -b^{144, 4}_2 ∨ -b^{144, 4}_1 ∨ -b^{144, 4}_0 ∨ false 
c  in DIMACS:
-20720 -20721 -20722  0

c i = 5
c  -2+1 --> -1
c    ( b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧  p_720) -> ( b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0)
c  in CNF:
c    -b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨  b^{144, 6}_2
c    -b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_1
c    -b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨  b^{144, 6}_0
c  in DIMACS:
-20723 -20724  20725 -720  20726 0
-20723 -20724  20725 -720 -20727 0
-20723 -20724  20725 -720  20728 0

c  -1+1 --> 0
c    ( b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0 ∧  p_720) -> (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧ -b^{144, 6}_0)
c  in CNF:
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_2
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_1
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_0
c  in DIMACS:
-20723  20724 -20725 -720 -20726 0
-20723  20724 -20725 -720 -20727 0
-20723  20724 -20725 -720 -20728 0

c  0+1 --> 1
c    (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧  p_720) -> (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0)
c  in CNF:
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_2
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_1
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨  b^{144, 6}_0
c  in DIMACS:
 20723  20724  20725 -720 -20726 0
 20723  20724  20725 -720 -20727 0
 20723  20724  20725 -720  20728 0

c  1+1 --> 2
c    (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0 ∧  p_720) -> (-b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0)
c  in CNF:
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_2
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨  b^{144, 6}_1
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ -p_720 ∨ -b^{144, 6}_0
c  in DIMACS:
 20723  20724 -20725 -720 -20726 0
 20723  20724 -20725 -720  20727 0
 20723  20724 -20725 -720 -20728 0

c  2+1 --> break 
c    (-b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧  p_720) -> break
c  in CNF:
c     b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 20723 -20724  20725 -720 1162 0


c  2-1 --> 1
c    (-b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧ -p_720) -> (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0)
c  in CNF:
c     b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_2
c     b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_1
c     b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨  b^{144, 6}_0
c  in DIMACS:
 20723 -20724  20725  720 -20726 0
 20723 -20724  20725  720 -20727 0
 20723 -20724  20725  720  20728 0

c  1-1 --> 0
c    (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0 ∧ -p_720) -> (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧ -b^{144, 6}_0)
c  in CNF:
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_2
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_1
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_0
c  in DIMACS:
 20723  20724 -20725  720 -20726 0
 20723  20724 -20725  720 -20727 0
 20723  20724 -20725  720 -20728 0

c  0-1 --> -1
c    (-b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧ -p_720) -> ( b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0)
c  in CNF:
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨  b^{144, 6}_2
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_1
c     b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨  b^{144, 6}_0
c  in DIMACS:
 20723  20724  20725  720  20726 0
 20723  20724  20725  720 -20727 0
 20723  20724  20725  720  20728 0

c  -1-1 --> -2
c    ( b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧  b^{144, 5}_0 ∧ -p_720) -> ( b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0)
c  in CNF:
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨  b^{144, 6}_2
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨  b^{144, 6}_1
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨  p_720 ∨ -b^{144, 6}_0
c  in DIMACS:
-20723  20724 -20725  720  20726 0
-20723  20724 -20725  720  20727 0
-20723  20724 -20725  720 -20728 0

c  -2-1 --> break 
c    ( b^{144, 5}_2 ∧  b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨  b^{144, 5}_0 ∨  p_720 ∨ break
c  in DIMACS:
-20723 -20724  20725  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 5}_2 ∧ -b^{144, 5}_1 ∧ -b^{144, 5}_0 ∧ true) 
c  in CNF:
c    -b^{144, 5}_2 ∨  b^{144, 5}_1 ∨  b^{144, 5}_0 ∨ false 
c  in DIMACS:
-20723  20724  20725  0

c  3 does not represent an automaton state.
c    -(-b^{144, 5}_2 ∧  b^{144, 5}_1 ∧  b^{144, 5}_0 ∧ true) 
c  in CNF:
c     b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ false 
c  in DIMACS:
 20723 -20724 -20725  0
c  -3 does not represent an automaton state.
c    -( b^{144, 5}_2 ∧  b^{144, 5}_1 ∧  b^{144, 5}_0 ∧ true) 
c  in CNF:
c    -b^{144, 5}_2 ∨ -b^{144, 5}_1 ∨ -b^{144, 5}_0 ∨ false 
c  in DIMACS:
-20723 -20724 -20725  0

c i = 6
c  -2+1 --> -1
c    ( b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧  p_864) -> ( b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0)
c  in CNF:
c    -b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨  b^{144, 7}_2
c    -b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_1
c    -b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨  b^{144, 7}_0
c  in DIMACS:
-20726 -20727  20728 -864  20729 0
-20726 -20727  20728 -864 -20730 0
-20726 -20727  20728 -864  20731 0

c  -1+1 --> 0
c    ( b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0 ∧  p_864) -> (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧ -b^{144, 7}_0)
c  in CNF:
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_2
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_1
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_0
c  in DIMACS:
-20726  20727 -20728 -864 -20729 0
-20726  20727 -20728 -864 -20730 0
-20726  20727 -20728 -864 -20731 0

c  0+1 --> 1
c    (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧  p_864) -> (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0)
c  in CNF:
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_2
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_1
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨  b^{144, 7}_0
c  in DIMACS:
 20726  20727  20728 -864 -20729 0
 20726  20727  20728 -864 -20730 0
 20726  20727  20728 -864  20731 0

c  1+1 --> 2
c    (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0 ∧  p_864) -> (-b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0)
c  in CNF:
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_2
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨  b^{144, 7}_1
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ -p_864 ∨ -b^{144, 7}_0
c  in DIMACS:
 20726  20727 -20728 -864 -20729 0
 20726  20727 -20728 -864  20730 0
 20726  20727 -20728 -864 -20731 0

c  2+1 --> break 
c    (-b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧  p_864) -> break
c  in CNF:
c     b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 20726 -20727  20728 -864 1162 0


c  2-1 --> 1
c    (-b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧ -p_864) -> (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0)
c  in CNF:
c     b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_2
c     b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_1
c     b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨  b^{144, 7}_0
c  in DIMACS:
 20726 -20727  20728  864 -20729 0
 20726 -20727  20728  864 -20730 0
 20726 -20727  20728  864  20731 0

c  1-1 --> 0
c    (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0 ∧ -p_864) -> (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧ -b^{144, 7}_0)
c  in CNF:
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_2
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_1
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_0
c  in DIMACS:
 20726  20727 -20728  864 -20729 0
 20726  20727 -20728  864 -20730 0
 20726  20727 -20728  864 -20731 0

c  0-1 --> -1
c    (-b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧ -p_864) -> ( b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0)
c  in CNF:
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨  b^{144, 7}_2
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_1
c     b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨  b^{144, 7}_0
c  in DIMACS:
 20726  20727  20728  864  20729 0
 20726  20727  20728  864 -20730 0
 20726  20727  20728  864  20731 0

c  -1-1 --> -2
c    ( b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧  b^{144, 6}_0 ∧ -p_864) -> ( b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0)
c  in CNF:
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨  b^{144, 7}_2
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨  b^{144, 7}_1
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨  p_864 ∨ -b^{144, 7}_0
c  in DIMACS:
-20726  20727 -20728  864  20729 0
-20726  20727 -20728  864  20730 0
-20726  20727 -20728  864 -20731 0

c  -2-1 --> break 
c    ( b^{144, 6}_2 ∧  b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨  b^{144, 6}_0 ∨  p_864 ∨ break
c  in DIMACS:
-20726 -20727  20728  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 6}_2 ∧ -b^{144, 6}_1 ∧ -b^{144, 6}_0 ∧ true) 
c  in CNF:
c    -b^{144, 6}_2 ∨  b^{144, 6}_1 ∨  b^{144, 6}_0 ∨ false 
c  in DIMACS:
-20726  20727  20728  0

c  3 does not represent an automaton state.
c    -(-b^{144, 6}_2 ∧  b^{144, 6}_1 ∧  b^{144, 6}_0 ∧ true) 
c  in CNF:
c     b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ false 
c  in DIMACS:
 20726 -20727 -20728  0
c  -3 does not represent an automaton state.
c    -( b^{144, 6}_2 ∧  b^{144, 6}_1 ∧  b^{144, 6}_0 ∧ true) 
c  in CNF:
c    -b^{144, 6}_2 ∨ -b^{144, 6}_1 ∨ -b^{144, 6}_0 ∨ false 
c  in DIMACS:
-20726 -20727 -20728  0

c i = 7
c  -2+1 --> -1
c    ( b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧  p_1008) -> ( b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0)
c  in CNF:
c    -b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨  b^{144, 8}_2
c    -b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_1
c    -b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨  b^{144, 8}_0
c  in DIMACS:
-20729 -20730  20731 -1008  20732 0
-20729 -20730  20731 -1008 -20733 0
-20729 -20730  20731 -1008  20734 0

c  -1+1 --> 0
c    ( b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0 ∧  p_1008) -> (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧ -b^{144, 8}_0)
c  in CNF:
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_2
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_1
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_0
c  in DIMACS:
-20729  20730 -20731 -1008 -20732 0
-20729  20730 -20731 -1008 -20733 0
-20729  20730 -20731 -1008 -20734 0

c  0+1 --> 1
c    (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧  p_1008) -> (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0)
c  in CNF:
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_2
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_1
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨  b^{144, 8}_0
c  in DIMACS:
 20729  20730  20731 -1008 -20732 0
 20729  20730  20731 -1008 -20733 0
 20729  20730  20731 -1008  20734 0

c  1+1 --> 2
c    (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0 ∧  p_1008) -> (-b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0)
c  in CNF:
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_2
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨  b^{144, 8}_1
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ -p_1008 ∨ -b^{144, 8}_0
c  in DIMACS:
 20729  20730 -20731 -1008 -20732 0
 20729  20730 -20731 -1008  20733 0
 20729  20730 -20731 -1008 -20734 0

c  2+1 --> break 
c    (-b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 20729 -20730  20731 -1008 1162 0


c  2-1 --> 1
c    (-b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧ -p_1008) -> (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0)
c  in CNF:
c     b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_2
c     b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_1
c     b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨  b^{144, 8}_0
c  in DIMACS:
 20729 -20730  20731  1008 -20732 0
 20729 -20730  20731  1008 -20733 0
 20729 -20730  20731  1008  20734 0

c  1-1 --> 0
c    (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0 ∧ -p_1008) -> (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧ -b^{144, 8}_0)
c  in CNF:
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_2
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_1
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_0
c  in DIMACS:
 20729  20730 -20731  1008 -20732 0
 20729  20730 -20731  1008 -20733 0
 20729  20730 -20731  1008 -20734 0

c  0-1 --> -1
c    (-b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧ -p_1008) -> ( b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0)
c  in CNF:
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨  b^{144, 8}_2
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_1
c     b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨  b^{144, 8}_0
c  in DIMACS:
 20729  20730  20731  1008  20732 0
 20729  20730  20731  1008 -20733 0
 20729  20730  20731  1008  20734 0

c  -1-1 --> -2
c    ( b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧  b^{144, 7}_0 ∧ -p_1008) -> ( b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0)
c  in CNF:
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨  b^{144, 8}_2
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨  b^{144, 8}_1
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨  p_1008 ∨ -b^{144, 8}_0
c  in DIMACS:
-20729  20730 -20731  1008  20732 0
-20729  20730 -20731  1008  20733 0
-20729  20730 -20731  1008 -20734 0

c  -2-1 --> break 
c    ( b^{144, 7}_2 ∧  b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨  b^{144, 7}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-20729 -20730  20731  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 7}_2 ∧ -b^{144, 7}_1 ∧ -b^{144, 7}_0 ∧ true) 
c  in CNF:
c    -b^{144, 7}_2 ∨  b^{144, 7}_1 ∨  b^{144, 7}_0 ∨ false 
c  in DIMACS:
-20729  20730  20731  0

c  3 does not represent an automaton state.
c    -(-b^{144, 7}_2 ∧  b^{144, 7}_1 ∧  b^{144, 7}_0 ∧ true) 
c  in CNF:
c     b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ false 
c  in DIMACS:
 20729 -20730 -20731  0
c  -3 does not represent an automaton state.
c    -( b^{144, 7}_2 ∧  b^{144, 7}_1 ∧  b^{144, 7}_0 ∧ true) 
c  in CNF:
c    -b^{144, 7}_2 ∨ -b^{144, 7}_1 ∨ -b^{144, 7}_0 ∨ false 
c  in DIMACS:
-20729 -20730 -20731  0

c i = 8
c  -2+1 --> -1
c    ( b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧  p_1152) -> ( b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧  b^{144, 9}_0)
c  in CNF:
c    -b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨  b^{144, 9}_2
c    -b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_1
c    -b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨  b^{144, 9}_0
c  in DIMACS:
-20732 -20733  20734 -1152  20735 0
-20732 -20733  20734 -1152 -20736 0
-20732 -20733  20734 -1152  20737 0

c  -1+1 --> 0
c    ( b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0 ∧  p_1152) -> (-b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧ -b^{144, 9}_0)
c  in CNF:
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_2
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_1
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_0
c  in DIMACS:
-20732  20733 -20734 -1152 -20735 0
-20732  20733 -20734 -1152 -20736 0
-20732  20733 -20734 -1152 -20737 0

c  0+1 --> 1
c    (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧  p_1152) -> (-b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧  b^{144, 9}_0)
c  in CNF:
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_2
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_1
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨  b^{144, 9}_0
c  in DIMACS:
 20732  20733  20734 -1152 -20735 0
 20732  20733  20734 -1152 -20736 0
 20732  20733  20734 -1152  20737 0

c  1+1 --> 2
c    (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0 ∧  p_1152) -> (-b^{144, 9}_2 ∧  b^{144, 9}_1 ∧ -b^{144, 9}_0)
c  in CNF:
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_2
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨  b^{144, 9}_1
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ -p_1152 ∨ -b^{144, 9}_0
c  in DIMACS:
 20732  20733 -20734 -1152 -20735 0
 20732  20733 -20734 -1152  20736 0
 20732  20733 -20734 -1152 -20737 0

c  2+1 --> break 
c    (-b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 20732 -20733  20734 -1152 1162 0


c  2-1 --> 1
c    (-b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧ -p_1152) -> (-b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧  b^{144, 9}_0)
c  in CNF:
c     b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_2
c     b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_1
c     b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨  b^{144, 9}_0
c  in DIMACS:
 20732 -20733  20734  1152 -20735 0
 20732 -20733  20734  1152 -20736 0
 20732 -20733  20734  1152  20737 0

c  1-1 --> 0
c    (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0 ∧ -p_1152) -> (-b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧ -b^{144, 9}_0)
c  in CNF:
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_2
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_1
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_0
c  in DIMACS:
 20732  20733 -20734  1152 -20735 0
 20732  20733 -20734  1152 -20736 0
 20732  20733 -20734  1152 -20737 0

c  0-1 --> -1
c    (-b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧ -p_1152) -> ( b^{144, 9}_2 ∧ -b^{144, 9}_1 ∧  b^{144, 9}_0)
c  in CNF:
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨  b^{144, 9}_2
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_1
c     b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨  b^{144, 9}_0
c  in DIMACS:
 20732  20733  20734  1152  20735 0
 20732  20733  20734  1152 -20736 0
 20732  20733  20734  1152  20737 0

c  -1-1 --> -2
c    ( b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧  b^{144, 8}_0 ∧ -p_1152) -> ( b^{144, 9}_2 ∧  b^{144, 9}_1 ∧ -b^{144, 9}_0)
c  in CNF:
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨  b^{144, 9}_2
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨  b^{144, 9}_1
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨  p_1152 ∨ -b^{144, 9}_0
c  in DIMACS:
-20732  20733 -20734  1152  20735 0
-20732  20733 -20734  1152  20736 0
-20732  20733 -20734  1152 -20737 0

c  -2-1 --> break 
c    ( b^{144, 8}_2 ∧  b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨  b^{144, 8}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-20732 -20733  20734  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{144, 8}_2 ∧ -b^{144, 8}_1 ∧ -b^{144, 8}_0 ∧ true) 
c  in CNF:
c    -b^{144, 8}_2 ∨  b^{144, 8}_1 ∨  b^{144, 8}_0 ∨ false 
c  in DIMACS:
-20732  20733  20734  0

c  3 does not represent an automaton state.
c    -(-b^{144, 8}_2 ∧  b^{144, 8}_1 ∧  b^{144, 8}_0 ∧ true) 
c  in CNF:
c     b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ false 
c  in DIMACS:
 20732 -20733 -20734  0
c  -3 does not represent an automaton state.
c    -( b^{144, 8}_2 ∧  b^{144, 8}_1 ∧  b^{144, 8}_0 ∧ true) 
c  in CNF:
c    -b^{144, 8}_2 ∨ -b^{144, 8}_1 ∨ -b^{144, 8}_0 ∨ false 
c  in DIMACS:
-20732 -20733 -20734  0

c INIT for k = 145
c    -b^{145, 1}_2
c    -b^{145, 1}_1
c    -b^{145, 1}_0
c  in DIMACS:
-20738 0
-20739 0
-20740 0

c Transitions for k = 145
c i = 1
c  -2+1 --> -1
c    ( b^{145, 1}_2 ∧  b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧  p_145) -> ( b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0)
c  in CNF:
c    -b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨  b^{145, 2}_2
c    -b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_1
c    -b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨  b^{145, 2}_0
c  in DIMACS:
-20738 -20739  20740 -145  20741 0
-20738 -20739  20740 -145 -20742 0
-20738 -20739  20740 -145  20743 0

c  -1+1 --> 0
c    ( b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧  b^{145, 1}_0 ∧  p_145) -> (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧ -b^{145, 2}_0)
c  in CNF:
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_2
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_1
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_0
c  in DIMACS:
-20738  20739 -20740 -145 -20741 0
-20738  20739 -20740 -145 -20742 0
-20738  20739 -20740 -145 -20743 0

c  0+1 --> 1
c    (-b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧  p_145) -> (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0)
c  in CNF:
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_2
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_1
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨  b^{145, 2}_0
c  in DIMACS:
 20738  20739  20740 -145 -20741 0
 20738  20739  20740 -145 -20742 0
 20738  20739  20740 -145  20743 0

c  1+1 --> 2
c    (-b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧  b^{145, 1}_0 ∧  p_145) -> (-b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0)
c  in CNF:
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_2
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨  b^{145, 2}_1
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ -p_145 ∨ -b^{145, 2}_0
c  in DIMACS:
 20738  20739 -20740 -145 -20741 0
 20738  20739 -20740 -145  20742 0
 20738  20739 -20740 -145 -20743 0

c  2+1 --> break 
c    (-b^{145, 1}_2 ∧  b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧  p_145) -> break
c  in CNF:
c     b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ -p_145 ∨ break
c  in DIMACS:
 20738 -20739  20740 -145 1162 0


c  2-1 --> 1
c    (-b^{145, 1}_2 ∧  b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧ -p_145) -> (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0)
c  in CNF:
c     b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_2
c     b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_1
c     b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨  b^{145, 2}_0
c  in DIMACS:
 20738 -20739  20740  145 -20741 0
 20738 -20739  20740  145 -20742 0
 20738 -20739  20740  145  20743 0

c  1-1 --> 0
c    (-b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧  b^{145, 1}_0 ∧ -p_145) -> (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧ -b^{145, 2}_0)
c  in CNF:
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_2
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_1
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_0
c  in DIMACS:
 20738  20739 -20740  145 -20741 0
 20738  20739 -20740  145 -20742 0
 20738  20739 -20740  145 -20743 0

c  0-1 --> -1
c    (-b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧ -p_145) -> ( b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0)
c  in CNF:
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨  b^{145, 2}_2
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_1
c     b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨  b^{145, 2}_0
c  in DIMACS:
 20738  20739  20740  145  20741 0
 20738  20739  20740  145 -20742 0
 20738  20739  20740  145  20743 0

c  -1-1 --> -2
c    ( b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧  b^{145, 1}_0 ∧ -p_145) -> ( b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0)
c  in CNF:
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨  b^{145, 2}_2
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨  b^{145, 2}_1
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨  p_145 ∨ -b^{145, 2}_0
c  in DIMACS:
-20738  20739 -20740  145  20741 0
-20738  20739 -20740  145  20742 0
-20738  20739 -20740  145 -20743 0

c  -2-1 --> break 
c    ( b^{145, 1}_2 ∧  b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧ -p_145) -> break
c  in CNF:
c    -b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨  b^{145, 1}_0 ∨  p_145 ∨ break
c  in DIMACS:
-20738 -20739  20740  145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 1}_2 ∧ -b^{145, 1}_1 ∧ -b^{145, 1}_0 ∧ true) 
c  in CNF:
c    -b^{145, 1}_2 ∨  b^{145, 1}_1 ∨  b^{145, 1}_0 ∨ false 
c  in DIMACS:
-20738  20739  20740  0

c  3 does not represent an automaton state.
c    -(-b^{145, 1}_2 ∧  b^{145, 1}_1 ∧  b^{145, 1}_0 ∧ true) 
c  in CNF:
c     b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ false 
c  in DIMACS:
 20738 -20739 -20740  0
c  -3 does not represent an automaton state.
c    -( b^{145, 1}_2 ∧  b^{145, 1}_1 ∧  b^{145, 1}_0 ∧ true) 
c  in CNF:
c    -b^{145, 1}_2 ∨ -b^{145, 1}_1 ∨ -b^{145, 1}_0 ∨ false 
c  in DIMACS:
-20738 -20739 -20740  0

c i = 2
c  -2+1 --> -1
c    ( b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧  p_290) -> ( b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0)
c  in CNF:
c    -b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨  b^{145, 3}_2
c    -b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_1
c    -b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨  b^{145, 3}_0
c  in DIMACS:
-20741 -20742  20743 -290  20744 0
-20741 -20742  20743 -290 -20745 0
-20741 -20742  20743 -290  20746 0

c  -1+1 --> 0
c    ( b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0 ∧  p_290) -> (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧ -b^{145, 3}_0)
c  in CNF:
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_2
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_1
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_0
c  in DIMACS:
-20741  20742 -20743 -290 -20744 0
-20741  20742 -20743 -290 -20745 0
-20741  20742 -20743 -290 -20746 0

c  0+1 --> 1
c    (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧  p_290) -> (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0)
c  in CNF:
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_2
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_1
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨  b^{145, 3}_0
c  in DIMACS:
 20741  20742  20743 -290 -20744 0
 20741  20742  20743 -290 -20745 0
 20741  20742  20743 -290  20746 0

c  1+1 --> 2
c    (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0 ∧  p_290) -> (-b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0)
c  in CNF:
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_2
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨  b^{145, 3}_1
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ -p_290 ∨ -b^{145, 3}_0
c  in DIMACS:
 20741  20742 -20743 -290 -20744 0
 20741  20742 -20743 -290  20745 0
 20741  20742 -20743 -290 -20746 0

c  2+1 --> break 
c    (-b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧  p_290) -> break
c  in CNF:
c     b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 20741 -20742  20743 -290 1162 0


c  2-1 --> 1
c    (-b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧ -p_290) -> (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0)
c  in CNF:
c     b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_2
c     b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_1
c     b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨  b^{145, 3}_0
c  in DIMACS:
 20741 -20742  20743  290 -20744 0
 20741 -20742  20743  290 -20745 0
 20741 -20742  20743  290  20746 0

c  1-1 --> 0
c    (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0 ∧ -p_290) -> (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧ -b^{145, 3}_0)
c  in CNF:
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_2
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_1
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_0
c  in DIMACS:
 20741  20742 -20743  290 -20744 0
 20741  20742 -20743  290 -20745 0
 20741  20742 -20743  290 -20746 0

c  0-1 --> -1
c    (-b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧ -p_290) -> ( b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0)
c  in CNF:
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨  b^{145, 3}_2
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_1
c     b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨  b^{145, 3}_0
c  in DIMACS:
 20741  20742  20743  290  20744 0
 20741  20742  20743  290 -20745 0
 20741  20742  20743  290  20746 0

c  -1-1 --> -2
c    ( b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧  b^{145, 2}_0 ∧ -p_290) -> ( b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0)
c  in CNF:
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨  b^{145, 3}_2
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨  b^{145, 3}_1
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨  p_290 ∨ -b^{145, 3}_0
c  in DIMACS:
-20741  20742 -20743  290  20744 0
-20741  20742 -20743  290  20745 0
-20741  20742 -20743  290 -20746 0

c  -2-1 --> break 
c    ( b^{145, 2}_2 ∧  b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨  b^{145, 2}_0 ∨  p_290 ∨ break
c  in DIMACS:
-20741 -20742  20743  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 2}_2 ∧ -b^{145, 2}_1 ∧ -b^{145, 2}_0 ∧ true) 
c  in CNF:
c    -b^{145, 2}_2 ∨  b^{145, 2}_1 ∨  b^{145, 2}_0 ∨ false 
c  in DIMACS:
-20741  20742  20743  0

c  3 does not represent an automaton state.
c    -(-b^{145, 2}_2 ∧  b^{145, 2}_1 ∧  b^{145, 2}_0 ∧ true) 
c  in CNF:
c     b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ false 
c  in DIMACS:
 20741 -20742 -20743  0
c  -3 does not represent an automaton state.
c    -( b^{145, 2}_2 ∧  b^{145, 2}_1 ∧  b^{145, 2}_0 ∧ true) 
c  in CNF:
c    -b^{145, 2}_2 ∨ -b^{145, 2}_1 ∨ -b^{145, 2}_0 ∨ false 
c  in DIMACS:
-20741 -20742 -20743  0

c i = 3
c  -2+1 --> -1
c    ( b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧  p_435) -> ( b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0)
c  in CNF:
c    -b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨  b^{145, 4}_2
c    -b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_1
c    -b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨  b^{145, 4}_0
c  in DIMACS:
-20744 -20745  20746 -435  20747 0
-20744 -20745  20746 -435 -20748 0
-20744 -20745  20746 -435  20749 0

c  -1+1 --> 0
c    ( b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0 ∧  p_435) -> (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧ -b^{145, 4}_0)
c  in CNF:
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_2
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_1
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_0
c  in DIMACS:
-20744  20745 -20746 -435 -20747 0
-20744  20745 -20746 -435 -20748 0
-20744  20745 -20746 -435 -20749 0

c  0+1 --> 1
c    (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧  p_435) -> (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0)
c  in CNF:
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_2
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_1
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨  b^{145, 4}_0
c  in DIMACS:
 20744  20745  20746 -435 -20747 0
 20744  20745  20746 -435 -20748 0
 20744  20745  20746 -435  20749 0

c  1+1 --> 2
c    (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0 ∧  p_435) -> (-b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0)
c  in CNF:
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_2
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨  b^{145, 4}_1
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ -p_435 ∨ -b^{145, 4}_0
c  in DIMACS:
 20744  20745 -20746 -435 -20747 0
 20744  20745 -20746 -435  20748 0
 20744  20745 -20746 -435 -20749 0

c  2+1 --> break 
c    (-b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧  p_435) -> break
c  in CNF:
c     b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ -p_435 ∨ break
c  in DIMACS:
 20744 -20745  20746 -435 1162 0


c  2-1 --> 1
c    (-b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧ -p_435) -> (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0)
c  in CNF:
c     b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_2
c     b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_1
c     b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨  b^{145, 4}_0
c  in DIMACS:
 20744 -20745  20746  435 -20747 0
 20744 -20745  20746  435 -20748 0
 20744 -20745  20746  435  20749 0

c  1-1 --> 0
c    (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0 ∧ -p_435) -> (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧ -b^{145, 4}_0)
c  in CNF:
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_2
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_1
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_0
c  in DIMACS:
 20744  20745 -20746  435 -20747 0
 20744  20745 -20746  435 -20748 0
 20744  20745 -20746  435 -20749 0

c  0-1 --> -1
c    (-b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧ -p_435) -> ( b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0)
c  in CNF:
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨  b^{145, 4}_2
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_1
c     b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨  b^{145, 4}_0
c  in DIMACS:
 20744  20745  20746  435  20747 0
 20744  20745  20746  435 -20748 0
 20744  20745  20746  435  20749 0

c  -1-1 --> -2
c    ( b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧  b^{145, 3}_0 ∧ -p_435) -> ( b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0)
c  in CNF:
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨  b^{145, 4}_2
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨  b^{145, 4}_1
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨  p_435 ∨ -b^{145, 4}_0
c  in DIMACS:
-20744  20745 -20746  435  20747 0
-20744  20745 -20746  435  20748 0
-20744  20745 -20746  435 -20749 0

c  -2-1 --> break 
c    ( b^{145, 3}_2 ∧  b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧ -p_435) -> break
c  in CNF:
c    -b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨  b^{145, 3}_0 ∨  p_435 ∨ break
c  in DIMACS:
-20744 -20745  20746  435 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 3}_2 ∧ -b^{145, 3}_1 ∧ -b^{145, 3}_0 ∧ true) 
c  in CNF:
c    -b^{145, 3}_2 ∨  b^{145, 3}_1 ∨  b^{145, 3}_0 ∨ false 
c  in DIMACS:
-20744  20745  20746  0

c  3 does not represent an automaton state.
c    -(-b^{145, 3}_2 ∧  b^{145, 3}_1 ∧  b^{145, 3}_0 ∧ true) 
c  in CNF:
c     b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ false 
c  in DIMACS:
 20744 -20745 -20746  0
c  -3 does not represent an automaton state.
c    -( b^{145, 3}_2 ∧  b^{145, 3}_1 ∧  b^{145, 3}_0 ∧ true) 
c  in CNF:
c    -b^{145, 3}_2 ∨ -b^{145, 3}_1 ∨ -b^{145, 3}_0 ∨ false 
c  in DIMACS:
-20744 -20745 -20746  0

c i = 4
c  -2+1 --> -1
c    ( b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧  p_580) -> ( b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0)
c  in CNF:
c    -b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨  b^{145, 5}_2
c    -b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_1
c    -b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨  b^{145, 5}_0
c  in DIMACS:
-20747 -20748  20749 -580  20750 0
-20747 -20748  20749 -580 -20751 0
-20747 -20748  20749 -580  20752 0

c  -1+1 --> 0
c    ( b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0 ∧  p_580) -> (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧ -b^{145, 5}_0)
c  in CNF:
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_2
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_1
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_0
c  in DIMACS:
-20747  20748 -20749 -580 -20750 0
-20747  20748 -20749 -580 -20751 0
-20747  20748 -20749 -580 -20752 0

c  0+1 --> 1
c    (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧  p_580) -> (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0)
c  in CNF:
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_2
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_1
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨  b^{145, 5}_0
c  in DIMACS:
 20747  20748  20749 -580 -20750 0
 20747  20748  20749 -580 -20751 0
 20747  20748  20749 -580  20752 0

c  1+1 --> 2
c    (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0 ∧  p_580) -> (-b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0)
c  in CNF:
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_2
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨  b^{145, 5}_1
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ -p_580 ∨ -b^{145, 5}_0
c  in DIMACS:
 20747  20748 -20749 -580 -20750 0
 20747  20748 -20749 -580  20751 0
 20747  20748 -20749 -580 -20752 0

c  2+1 --> break 
c    (-b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧  p_580) -> break
c  in CNF:
c     b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 20747 -20748  20749 -580 1162 0


c  2-1 --> 1
c    (-b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧ -p_580) -> (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0)
c  in CNF:
c     b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_2
c     b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_1
c     b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨  b^{145, 5}_0
c  in DIMACS:
 20747 -20748  20749  580 -20750 0
 20747 -20748  20749  580 -20751 0
 20747 -20748  20749  580  20752 0

c  1-1 --> 0
c    (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0 ∧ -p_580) -> (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧ -b^{145, 5}_0)
c  in CNF:
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_2
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_1
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_0
c  in DIMACS:
 20747  20748 -20749  580 -20750 0
 20747  20748 -20749  580 -20751 0
 20747  20748 -20749  580 -20752 0

c  0-1 --> -1
c    (-b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧ -p_580) -> ( b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0)
c  in CNF:
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨  b^{145, 5}_2
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_1
c     b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨  b^{145, 5}_0
c  in DIMACS:
 20747  20748  20749  580  20750 0
 20747  20748  20749  580 -20751 0
 20747  20748  20749  580  20752 0

c  -1-1 --> -2
c    ( b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧  b^{145, 4}_0 ∧ -p_580) -> ( b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0)
c  in CNF:
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨  b^{145, 5}_2
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨  b^{145, 5}_1
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨  p_580 ∨ -b^{145, 5}_0
c  in DIMACS:
-20747  20748 -20749  580  20750 0
-20747  20748 -20749  580  20751 0
-20747  20748 -20749  580 -20752 0

c  -2-1 --> break 
c    ( b^{145, 4}_2 ∧  b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨  b^{145, 4}_0 ∨  p_580 ∨ break
c  in DIMACS:
-20747 -20748  20749  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 4}_2 ∧ -b^{145, 4}_1 ∧ -b^{145, 4}_0 ∧ true) 
c  in CNF:
c    -b^{145, 4}_2 ∨  b^{145, 4}_1 ∨  b^{145, 4}_0 ∨ false 
c  in DIMACS:
-20747  20748  20749  0

c  3 does not represent an automaton state.
c    -(-b^{145, 4}_2 ∧  b^{145, 4}_1 ∧  b^{145, 4}_0 ∧ true) 
c  in CNF:
c     b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ false 
c  in DIMACS:
 20747 -20748 -20749  0
c  -3 does not represent an automaton state.
c    -( b^{145, 4}_2 ∧  b^{145, 4}_1 ∧  b^{145, 4}_0 ∧ true) 
c  in CNF:
c    -b^{145, 4}_2 ∨ -b^{145, 4}_1 ∨ -b^{145, 4}_0 ∨ false 
c  in DIMACS:
-20747 -20748 -20749  0

c i = 5
c  -2+1 --> -1
c    ( b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧  p_725) -> ( b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0)
c  in CNF:
c    -b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨  b^{145, 6}_2
c    -b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_1
c    -b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨  b^{145, 6}_0
c  in DIMACS:
-20750 -20751  20752 -725  20753 0
-20750 -20751  20752 -725 -20754 0
-20750 -20751  20752 -725  20755 0

c  -1+1 --> 0
c    ( b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0 ∧  p_725) -> (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧ -b^{145, 6}_0)
c  in CNF:
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_2
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_1
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_0
c  in DIMACS:
-20750  20751 -20752 -725 -20753 0
-20750  20751 -20752 -725 -20754 0
-20750  20751 -20752 -725 -20755 0

c  0+1 --> 1
c    (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧  p_725) -> (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0)
c  in CNF:
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_2
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_1
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨  b^{145, 6}_0
c  in DIMACS:
 20750  20751  20752 -725 -20753 0
 20750  20751  20752 -725 -20754 0
 20750  20751  20752 -725  20755 0

c  1+1 --> 2
c    (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0 ∧  p_725) -> (-b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0)
c  in CNF:
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_2
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨  b^{145, 6}_1
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ -p_725 ∨ -b^{145, 6}_0
c  in DIMACS:
 20750  20751 -20752 -725 -20753 0
 20750  20751 -20752 -725  20754 0
 20750  20751 -20752 -725 -20755 0

c  2+1 --> break 
c    (-b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧  p_725) -> break
c  in CNF:
c     b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ -p_725 ∨ break
c  in DIMACS:
 20750 -20751  20752 -725 1162 0


c  2-1 --> 1
c    (-b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧ -p_725) -> (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0)
c  in CNF:
c     b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_2
c     b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_1
c     b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨  b^{145, 6}_0
c  in DIMACS:
 20750 -20751  20752  725 -20753 0
 20750 -20751  20752  725 -20754 0
 20750 -20751  20752  725  20755 0

c  1-1 --> 0
c    (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0 ∧ -p_725) -> (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧ -b^{145, 6}_0)
c  in CNF:
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_2
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_1
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_0
c  in DIMACS:
 20750  20751 -20752  725 -20753 0
 20750  20751 -20752  725 -20754 0
 20750  20751 -20752  725 -20755 0

c  0-1 --> -1
c    (-b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧ -p_725) -> ( b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0)
c  in CNF:
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨  b^{145, 6}_2
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_1
c     b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨  b^{145, 6}_0
c  in DIMACS:
 20750  20751  20752  725  20753 0
 20750  20751  20752  725 -20754 0
 20750  20751  20752  725  20755 0

c  -1-1 --> -2
c    ( b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧  b^{145, 5}_0 ∧ -p_725) -> ( b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0)
c  in CNF:
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨  b^{145, 6}_2
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨  b^{145, 6}_1
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨  p_725 ∨ -b^{145, 6}_0
c  in DIMACS:
-20750  20751 -20752  725  20753 0
-20750  20751 -20752  725  20754 0
-20750  20751 -20752  725 -20755 0

c  -2-1 --> break 
c    ( b^{145, 5}_2 ∧  b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧ -p_725) -> break
c  in CNF:
c    -b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨  b^{145, 5}_0 ∨  p_725 ∨ break
c  in DIMACS:
-20750 -20751  20752  725 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 5}_2 ∧ -b^{145, 5}_1 ∧ -b^{145, 5}_0 ∧ true) 
c  in CNF:
c    -b^{145, 5}_2 ∨  b^{145, 5}_1 ∨  b^{145, 5}_0 ∨ false 
c  in DIMACS:
-20750  20751  20752  0

c  3 does not represent an automaton state.
c    -(-b^{145, 5}_2 ∧  b^{145, 5}_1 ∧  b^{145, 5}_0 ∧ true) 
c  in CNF:
c     b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ false 
c  in DIMACS:
 20750 -20751 -20752  0
c  -3 does not represent an automaton state.
c    -( b^{145, 5}_2 ∧  b^{145, 5}_1 ∧  b^{145, 5}_0 ∧ true) 
c  in CNF:
c    -b^{145, 5}_2 ∨ -b^{145, 5}_1 ∨ -b^{145, 5}_0 ∨ false 
c  in DIMACS:
-20750 -20751 -20752  0

c i = 6
c  -2+1 --> -1
c    ( b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧  p_870) -> ( b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0)
c  in CNF:
c    -b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨  b^{145, 7}_2
c    -b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_1
c    -b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨  b^{145, 7}_0
c  in DIMACS:
-20753 -20754  20755 -870  20756 0
-20753 -20754  20755 -870 -20757 0
-20753 -20754  20755 -870  20758 0

c  -1+1 --> 0
c    ( b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0 ∧  p_870) -> (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧ -b^{145, 7}_0)
c  in CNF:
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_2
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_1
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_0
c  in DIMACS:
-20753  20754 -20755 -870 -20756 0
-20753  20754 -20755 -870 -20757 0
-20753  20754 -20755 -870 -20758 0

c  0+1 --> 1
c    (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧  p_870) -> (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0)
c  in CNF:
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_2
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_1
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨  b^{145, 7}_0
c  in DIMACS:
 20753  20754  20755 -870 -20756 0
 20753  20754  20755 -870 -20757 0
 20753  20754  20755 -870  20758 0

c  1+1 --> 2
c    (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0 ∧  p_870) -> (-b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0)
c  in CNF:
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_2
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨  b^{145, 7}_1
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ -p_870 ∨ -b^{145, 7}_0
c  in DIMACS:
 20753  20754 -20755 -870 -20756 0
 20753  20754 -20755 -870  20757 0
 20753  20754 -20755 -870 -20758 0

c  2+1 --> break 
c    (-b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧  p_870) -> break
c  in CNF:
c     b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 20753 -20754  20755 -870 1162 0


c  2-1 --> 1
c    (-b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧ -p_870) -> (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0)
c  in CNF:
c     b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_2
c     b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_1
c     b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨  b^{145, 7}_0
c  in DIMACS:
 20753 -20754  20755  870 -20756 0
 20753 -20754  20755  870 -20757 0
 20753 -20754  20755  870  20758 0

c  1-1 --> 0
c    (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0 ∧ -p_870) -> (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧ -b^{145, 7}_0)
c  in CNF:
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_2
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_1
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_0
c  in DIMACS:
 20753  20754 -20755  870 -20756 0
 20753  20754 -20755  870 -20757 0
 20753  20754 -20755  870 -20758 0

c  0-1 --> -1
c    (-b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧ -p_870) -> ( b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0)
c  in CNF:
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨  b^{145, 7}_2
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_1
c     b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨  b^{145, 7}_0
c  in DIMACS:
 20753  20754  20755  870  20756 0
 20753  20754  20755  870 -20757 0
 20753  20754  20755  870  20758 0

c  -1-1 --> -2
c    ( b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧  b^{145, 6}_0 ∧ -p_870) -> ( b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0)
c  in CNF:
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨  b^{145, 7}_2
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨  b^{145, 7}_1
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨  p_870 ∨ -b^{145, 7}_0
c  in DIMACS:
-20753  20754 -20755  870  20756 0
-20753  20754 -20755  870  20757 0
-20753  20754 -20755  870 -20758 0

c  -2-1 --> break 
c    ( b^{145, 6}_2 ∧  b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨  b^{145, 6}_0 ∨  p_870 ∨ break
c  in DIMACS:
-20753 -20754  20755  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 6}_2 ∧ -b^{145, 6}_1 ∧ -b^{145, 6}_0 ∧ true) 
c  in CNF:
c    -b^{145, 6}_2 ∨  b^{145, 6}_1 ∨  b^{145, 6}_0 ∨ false 
c  in DIMACS:
-20753  20754  20755  0

c  3 does not represent an automaton state.
c    -(-b^{145, 6}_2 ∧  b^{145, 6}_1 ∧  b^{145, 6}_0 ∧ true) 
c  in CNF:
c     b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ false 
c  in DIMACS:
 20753 -20754 -20755  0
c  -3 does not represent an automaton state.
c    -( b^{145, 6}_2 ∧  b^{145, 6}_1 ∧  b^{145, 6}_0 ∧ true) 
c  in CNF:
c    -b^{145, 6}_2 ∨ -b^{145, 6}_1 ∨ -b^{145, 6}_0 ∨ false 
c  in DIMACS:
-20753 -20754 -20755  0

c i = 7
c  -2+1 --> -1
c    ( b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧  p_1015) -> ( b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0)
c  in CNF:
c    -b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨  b^{145, 8}_2
c    -b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_1
c    -b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨  b^{145, 8}_0
c  in DIMACS:
-20756 -20757  20758 -1015  20759 0
-20756 -20757  20758 -1015 -20760 0
-20756 -20757  20758 -1015  20761 0

c  -1+1 --> 0
c    ( b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0 ∧  p_1015) -> (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧ -b^{145, 8}_0)
c  in CNF:
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_2
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_1
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_0
c  in DIMACS:
-20756  20757 -20758 -1015 -20759 0
-20756  20757 -20758 -1015 -20760 0
-20756  20757 -20758 -1015 -20761 0

c  0+1 --> 1
c    (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧  p_1015) -> (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0)
c  in CNF:
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_2
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_1
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨  b^{145, 8}_0
c  in DIMACS:
 20756  20757  20758 -1015 -20759 0
 20756  20757  20758 -1015 -20760 0
 20756  20757  20758 -1015  20761 0

c  1+1 --> 2
c    (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0 ∧  p_1015) -> (-b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0)
c  in CNF:
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_2
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨  b^{145, 8}_1
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ -p_1015 ∨ -b^{145, 8}_0
c  in DIMACS:
 20756  20757 -20758 -1015 -20759 0
 20756  20757 -20758 -1015  20760 0
 20756  20757 -20758 -1015 -20761 0

c  2+1 --> break 
c    (-b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 20756 -20757  20758 -1015 1162 0


c  2-1 --> 1
c    (-b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧ -p_1015) -> (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0)
c  in CNF:
c     b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_2
c     b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_1
c     b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨  b^{145, 8}_0
c  in DIMACS:
 20756 -20757  20758  1015 -20759 0
 20756 -20757  20758  1015 -20760 0
 20756 -20757  20758  1015  20761 0

c  1-1 --> 0
c    (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0 ∧ -p_1015) -> (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧ -b^{145, 8}_0)
c  in CNF:
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_2
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_1
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_0
c  in DIMACS:
 20756  20757 -20758  1015 -20759 0
 20756  20757 -20758  1015 -20760 0
 20756  20757 -20758  1015 -20761 0

c  0-1 --> -1
c    (-b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧ -p_1015) -> ( b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0)
c  in CNF:
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨  b^{145, 8}_2
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_1
c     b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨  b^{145, 8}_0
c  in DIMACS:
 20756  20757  20758  1015  20759 0
 20756  20757  20758  1015 -20760 0
 20756  20757  20758  1015  20761 0

c  -1-1 --> -2
c    ( b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧  b^{145, 7}_0 ∧ -p_1015) -> ( b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0)
c  in CNF:
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨  b^{145, 8}_2
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨  b^{145, 8}_1
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨  p_1015 ∨ -b^{145, 8}_0
c  in DIMACS:
-20756  20757 -20758  1015  20759 0
-20756  20757 -20758  1015  20760 0
-20756  20757 -20758  1015 -20761 0

c  -2-1 --> break 
c    ( b^{145, 7}_2 ∧  b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨  b^{145, 7}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-20756 -20757  20758  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 7}_2 ∧ -b^{145, 7}_1 ∧ -b^{145, 7}_0 ∧ true) 
c  in CNF:
c    -b^{145, 7}_2 ∨  b^{145, 7}_1 ∨  b^{145, 7}_0 ∨ false 
c  in DIMACS:
-20756  20757  20758  0

c  3 does not represent an automaton state.
c    -(-b^{145, 7}_2 ∧  b^{145, 7}_1 ∧  b^{145, 7}_0 ∧ true) 
c  in CNF:
c     b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ false 
c  in DIMACS:
 20756 -20757 -20758  0
c  -3 does not represent an automaton state.
c    -( b^{145, 7}_2 ∧  b^{145, 7}_1 ∧  b^{145, 7}_0 ∧ true) 
c  in CNF:
c    -b^{145, 7}_2 ∨ -b^{145, 7}_1 ∨ -b^{145, 7}_0 ∨ false 
c  in DIMACS:
-20756 -20757 -20758  0

c i = 8
c  -2+1 --> -1
c    ( b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧  p_1160) -> ( b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧  b^{145, 9}_0)
c  in CNF:
c    -b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨  b^{145, 9}_2
c    -b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_1
c    -b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨  b^{145, 9}_0
c  in DIMACS:
-20759 -20760  20761 -1160  20762 0
-20759 -20760  20761 -1160 -20763 0
-20759 -20760  20761 -1160  20764 0

c  -1+1 --> 0
c    ( b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0 ∧  p_1160) -> (-b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧ -b^{145, 9}_0)
c  in CNF:
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_2
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_1
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_0
c  in DIMACS:
-20759  20760 -20761 -1160 -20762 0
-20759  20760 -20761 -1160 -20763 0
-20759  20760 -20761 -1160 -20764 0

c  0+1 --> 1
c    (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧  p_1160) -> (-b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧  b^{145, 9}_0)
c  in CNF:
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_2
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_1
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨  b^{145, 9}_0
c  in DIMACS:
 20759  20760  20761 -1160 -20762 0
 20759  20760  20761 -1160 -20763 0
 20759  20760  20761 -1160  20764 0

c  1+1 --> 2
c    (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0 ∧  p_1160) -> (-b^{145, 9}_2 ∧  b^{145, 9}_1 ∧ -b^{145, 9}_0)
c  in CNF:
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_2
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨  b^{145, 9}_1
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ -p_1160 ∨ -b^{145, 9}_0
c  in DIMACS:
 20759  20760 -20761 -1160 -20762 0
 20759  20760 -20761 -1160  20763 0
 20759  20760 -20761 -1160 -20764 0

c  2+1 --> break 
c    (-b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 20759 -20760  20761 -1160 1162 0


c  2-1 --> 1
c    (-b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧ -p_1160) -> (-b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧  b^{145, 9}_0)
c  in CNF:
c     b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_2
c     b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_1
c     b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨  b^{145, 9}_0
c  in DIMACS:
 20759 -20760  20761  1160 -20762 0
 20759 -20760  20761  1160 -20763 0
 20759 -20760  20761  1160  20764 0

c  1-1 --> 0
c    (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0 ∧ -p_1160) -> (-b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧ -b^{145, 9}_0)
c  in CNF:
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_2
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_1
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_0
c  in DIMACS:
 20759  20760 -20761  1160 -20762 0
 20759  20760 -20761  1160 -20763 0
 20759  20760 -20761  1160 -20764 0

c  0-1 --> -1
c    (-b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧ -p_1160) -> ( b^{145, 9}_2 ∧ -b^{145, 9}_1 ∧  b^{145, 9}_0)
c  in CNF:
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨  b^{145, 9}_2
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_1
c     b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨  b^{145, 9}_0
c  in DIMACS:
 20759  20760  20761  1160  20762 0
 20759  20760  20761  1160 -20763 0
 20759  20760  20761  1160  20764 0

c  -1-1 --> -2
c    ( b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧  b^{145, 8}_0 ∧ -p_1160) -> ( b^{145, 9}_2 ∧  b^{145, 9}_1 ∧ -b^{145, 9}_0)
c  in CNF:
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨  b^{145, 9}_2
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨  b^{145, 9}_1
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨  p_1160 ∨ -b^{145, 9}_0
c  in DIMACS:
-20759  20760 -20761  1160  20762 0
-20759  20760 -20761  1160  20763 0
-20759  20760 -20761  1160 -20764 0

c  -2-1 --> break 
c    ( b^{145, 8}_2 ∧  b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨  b^{145, 8}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-20759 -20760  20761  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{145, 8}_2 ∧ -b^{145, 8}_1 ∧ -b^{145, 8}_0 ∧ true) 
c  in CNF:
c    -b^{145, 8}_2 ∨  b^{145, 8}_1 ∨  b^{145, 8}_0 ∨ false 
c  in DIMACS:
-20759  20760  20761  0

c  3 does not represent an automaton state.
c    -(-b^{145, 8}_2 ∧  b^{145, 8}_1 ∧  b^{145, 8}_0 ∧ true) 
c  in CNF:
c     b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ false 
c  in DIMACS:
 20759 -20760 -20761  0
c  -3 does not represent an automaton state.
c    -( b^{145, 8}_2 ∧  b^{145, 8}_1 ∧  b^{145, 8}_0 ∧ true) 
c  in CNF:
c    -b^{145, 8}_2 ∨ -b^{145, 8}_1 ∨ -b^{145, 8}_0 ∨ false 
c  in DIMACS:
-20759 -20760 -20761  0

c INIT for k = 146
c    -b^{146, 1}_2
c    -b^{146, 1}_1
c    -b^{146, 1}_0
c  in DIMACS:
-20765 0
-20766 0
-20767 0

c Transitions for k = 146
c i = 1
c  -2+1 --> -1
c    ( b^{146, 1}_2 ∧  b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧  p_146) -> ( b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0)
c  in CNF:
c    -b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨  b^{146, 2}_2
c    -b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_1
c    -b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨  b^{146, 2}_0
c  in DIMACS:
-20765 -20766  20767 -146  20768 0
-20765 -20766  20767 -146 -20769 0
-20765 -20766  20767 -146  20770 0

c  -1+1 --> 0
c    ( b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧  b^{146, 1}_0 ∧  p_146) -> (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧ -b^{146, 2}_0)
c  in CNF:
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_2
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_1
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_0
c  in DIMACS:
-20765  20766 -20767 -146 -20768 0
-20765  20766 -20767 -146 -20769 0
-20765  20766 -20767 -146 -20770 0

c  0+1 --> 1
c    (-b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧  p_146) -> (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0)
c  in CNF:
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_2
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_1
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨  b^{146, 2}_0
c  in DIMACS:
 20765  20766  20767 -146 -20768 0
 20765  20766  20767 -146 -20769 0
 20765  20766  20767 -146  20770 0

c  1+1 --> 2
c    (-b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧  b^{146, 1}_0 ∧  p_146) -> (-b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0)
c  in CNF:
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_2
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨  b^{146, 2}_1
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ -p_146 ∨ -b^{146, 2}_0
c  in DIMACS:
 20765  20766 -20767 -146 -20768 0
 20765  20766 -20767 -146  20769 0
 20765  20766 -20767 -146 -20770 0

c  2+1 --> break 
c    (-b^{146, 1}_2 ∧  b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧  p_146) -> break
c  in CNF:
c     b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ -p_146 ∨ break
c  in DIMACS:
 20765 -20766  20767 -146 1162 0


c  2-1 --> 1
c    (-b^{146, 1}_2 ∧  b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧ -p_146) -> (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0)
c  in CNF:
c     b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_2
c     b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_1
c     b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨  b^{146, 2}_0
c  in DIMACS:
 20765 -20766  20767  146 -20768 0
 20765 -20766  20767  146 -20769 0
 20765 -20766  20767  146  20770 0

c  1-1 --> 0
c    (-b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧  b^{146, 1}_0 ∧ -p_146) -> (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧ -b^{146, 2}_0)
c  in CNF:
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_2
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_1
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_0
c  in DIMACS:
 20765  20766 -20767  146 -20768 0
 20765  20766 -20767  146 -20769 0
 20765  20766 -20767  146 -20770 0

c  0-1 --> -1
c    (-b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧ -p_146) -> ( b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0)
c  in CNF:
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨  b^{146, 2}_2
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_1
c     b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨  b^{146, 2}_0
c  in DIMACS:
 20765  20766  20767  146  20768 0
 20765  20766  20767  146 -20769 0
 20765  20766  20767  146  20770 0

c  -1-1 --> -2
c    ( b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧  b^{146, 1}_0 ∧ -p_146) -> ( b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0)
c  in CNF:
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨  b^{146, 2}_2
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨  b^{146, 2}_1
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨  p_146 ∨ -b^{146, 2}_0
c  in DIMACS:
-20765  20766 -20767  146  20768 0
-20765  20766 -20767  146  20769 0
-20765  20766 -20767  146 -20770 0

c  -2-1 --> break 
c    ( b^{146, 1}_2 ∧  b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧ -p_146) -> break
c  in CNF:
c    -b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨  b^{146, 1}_0 ∨  p_146 ∨ break
c  in DIMACS:
-20765 -20766  20767  146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 1}_2 ∧ -b^{146, 1}_1 ∧ -b^{146, 1}_0 ∧ true) 
c  in CNF:
c    -b^{146, 1}_2 ∨  b^{146, 1}_1 ∨  b^{146, 1}_0 ∨ false 
c  in DIMACS:
-20765  20766  20767  0

c  3 does not represent an automaton state.
c    -(-b^{146, 1}_2 ∧  b^{146, 1}_1 ∧  b^{146, 1}_0 ∧ true) 
c  in CNF:
c     b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ false 
c  in DIMACS:
 20765 -20766 -20767  0
c  -3 does not represent an automaton state.
c    -( b^{146, 1}_2 ∧  b^{146, 1}_1 ∧  b^{146, 1}_0 ∧ true) 
c  in CNF:
c    -b^{146, 1}_2 ∨ -b^{146, 1}_1 ∨ -b^{146, 1}_0 ∨ false 
c  in DIMACS:
-20765 -20766 -20767  0

c i = 2
c  -2+1 --> -1
c    ( b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧  p_292) -> ( b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0)
c  in CNF:
c    -b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨  b^{146, 3}_2
c    -b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_1
c    -b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨  b^{146, 3}_0
c  in DIMACS:
-20768 -20769  20770 -292  20771 0
-20768 -20769  20770 -292 -20772 0
-20768 -20769  20770 -292  20773 0

c  -1+1 --> 0
c    ( b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0 ∧  p_292) -> (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧ -b^{146, 3}_0)
c  in CNF:
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_2
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_1
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_0
c  in DIMACS:
-20768  20769 -20770 -292 -20771 0
-20768  20769 -20770 -292 -20772 0
-20768  20769 -20770 -292 -20773 0

c  0+1 --> 1
c    (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧  p_292) -> (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0)
c  in CNF:
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_2
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_1
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨  b^{146, 3}_0
c  in DIMACS:
 20768  20769  20770 -292 -20771 0
 20768  20769  20770 -292 -20772 0
 20768  20769  20770 -292  20773 0

c  1+1 --> 2
c    (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0 ∧  p_292) -> (-b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0)
c  in CNF:
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_2
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨  b^{146, 3}_1
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ -p_292 ∨ -b^{146, 3}_0
c  in DIMACS:
 20768  20769 -20770 -292 -20771 0
 20768  20769 -20770 -292  20772 0
 20768  20769 -20770 -292 -20773 0

c  2+1 --> break 
c    (-b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧  p_292) -> break
c  in CNF:
c     b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 20768 -20769  20770 -292 1162 0


c  2-1 --> 1
c    (-b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧ -p_292) -> (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0)
c  in CNF:
c     b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_2
c     b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_1
c     b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨  b^{146, 3}_0
c  in DIMACS:
 20768 -20769  20770  292 -20771 0
 20768 -20769  20770  292 -20772 0
 20768 -20769  20770  292  20773 0

c  1-1 --> 0
c    (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0 ∧ -p_292) -> (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧ -b^{146, 3}_0)
c  in CNF:
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_2
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_1
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_0
c  in DIMACS:
 20768  20769 -20770  292 -20771 0
 20768  20769 -20770  292 -20772 0
 20768  20769 -20770  292 -20773 0

c  0-1 --> -1
c    (-b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧ -p_292) -> ( b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0)
c  in CNF:
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨  b^{146, 3}_2
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_1
c     b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨  b^{146, 3}_0
c  in DIMACS:
 20768  20769  20770  292  20771 0
 20768  20769  20770  292 -20772 0
 20768  20769  20770  292  20773 0

c  -1-1 --> -2
c    ( b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧  b^{146, 2}_0 ∧ -p_292) -> ( b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0)
c  in CNF:
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨  b^{146, 3}_2
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨  b^{146, 3}_1
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨  p_292 ∨ -b^{146, 3}_0
c  in DIMACS:
-20768  20769 -20770  292  20771 0
-20768  20769 -20770  292  20772 0
-20768  20769 -20770  292 -20773 0

c  -2-1 --> break 
c    ( b^{146, 2}_2 ∧  b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨  b^{146, 2}_0 ∨  p_292 ∨ break
c  in DIMACS:
-20768 -20769  20770  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 2}_2 ∧ -b^{146, 2}_1 ∧ -b^{146, 2}_0 ∧ true) 
c  in CNF:
c    -b^{146, 2}_2 ∨  b^{146, 2}_1 ∨  b^{146, 2}_0 ∨ false 
c  in DIMACS:
-20768  20769  20770  0

c  3 does not represent an automaton state.
c    -(-b^{146, 2}_2 ∧  b^{146, 2}_1 ∧  b^{146, 2}_0 ∧ true) 
c  in CNF:
c     b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ false 
c  in DIMACS:
 20768 -20769 -20770  0
c  -3 does not represent an automaton state.
c    -( b^{146, 2}_2 ∧  b^{146, 2}_1 ∧  b^{146, 2}_0 ∧ true) 
c  in CNF:
c    -b^{146, 2}_2 ∨ -b^{146, 2}_1 ∨ -b^{146, 2}_0 ∨ false 
c  in DIMACS:
-20768 -20769 -20770  0

c i = 3
c  -2+1 --> -1
c    ( b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧  p_438) -> ( b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0)
c  in CNF:
c    -b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨  b^{146, 4}_2
c    -b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_1
c    -b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨  b^{146, 4}_0
c  in DIMACS:
-20771 -20772  20773 -438  20774 0
-20771 -20772  20773 -438 -20775 0
-20771 -20772  20773 -438  20776 0

c  -1+1 --> 0
c    ( b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0 ∧  p_438) -> (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧ -b^{146, 4}_0)
c  in CNF:
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_2
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_1
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_0
c  in DIMACS:
-20771  20772 -20773 -438 -20774 0
-20771  20772 -20773 -438 -20775 0
-20771  20772 -20773 -438 -20776 0

c  0+1 --> 1
c    (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧  p_438) -> (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0)
c  in CNF:
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_2
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_1
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨  b^{146, 4}_0
c  in DIMACS:
 20771  20772  20773 -438 -20774 0
 20771  20772  20773 -438 -20775 0
 20771  20772  20773 -438  20776 0

c  1+1 --> 2
c    (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0 ∧  p_438) -> (-b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0)
c  in CNF:
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_2
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨  b^{146, 4}_1
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ -p_438 ∨ -b^{146, 4}_0
c  in DIMACS:
 20771  20772 -20773 -438 -20774 0
 20771  20772 -20773 -438  20775 0
 20771  20772 -20773 -438 -20776 0

c  2+1 --> break 
c    (-b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧  p_438) -> break
c  in CNF:
c     b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 20771 -20772  20773 -438 1162 0


c  2-1 --> 1
c    (-b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧ -p_438) -> (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0)
c  in CNF:
c     b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_2
c     b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_1
c     b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨  b^{146, 4}_0
c  in DIMACS:
 20771 -20772  20773  438 -20774 0
 20771 -20772  20773  438 -20775 0
 20771 -20772  20773  438  20776 0

c  1-1 --> 0
c    (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0 ∧ -p_438) -> (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧ -b^{146, 4}_0)
c  in CNF:
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_2
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_1
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_0
c  in DIMACS:
 20771  20772 -20773  438 -20774 0
 20771  20772 -20773  438 -20775 0
 20771  20772 -20773  438 -20776 0

c  0-1 --> -1
c    (-b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧ -p_438) -> ( b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0)
c  in CNF:
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨  b^{146, 4}_2
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_1
c     b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨  b^{146, 4}_0
c  in DIMACS:
 20771  20772  20773  438  20774 0
 20771  20772  20773  438 -20775 0
 20771  20772  20773  438  20776 0

c  -1-1 --> -2
c    ( b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧  b^{146, 3}_0 ∧ -p_438) -> ( b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0)
c  in CNF:
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨  b^{146, 4}_2
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨  b^{146, 4}_1
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨  p_438 ∨ -b^{146, 4}_0
c  in DIMACS:
-20771  20772 -20773  438  20774 0
-20771  20772 -20773  438  20775 0
-20771  20772 -20773  438 -20776 0

c  -2-1 --> break 
c    ( b^{146, 3}_2 ∧  b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨  b^{146, 3}_0 ∨  p_438 ∨ break
c  in DIMACS:
-20771 -20772  20773  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 3}_2 ∧ -b^{146, 3}_1 ∧ -b^{146, 3}_0 ∧ true) 
c  in CNF:
c    -b^{146, 3}_2 ∨  b^{146, 3}_1 ∨  b^{146, 3}_0 ∨ false 
c  in DIMACS:
-20771  20772  20773  0

c  3 does not represent an automaton state.
c    -(-b^{146, 3}_2 ∧  b^{146, 3}_1 ∧  b^{146, 3}_0 ∧ true) 
c  in CNF:
c     b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ false 
c  in DIMACS:
 20771 -20772 -20773  0
c  -3 does not represent an automaton state.
c    -( b^{146, 3}_2 ∧  b^{146, 3}_1 ∧  b^{146, 3}_0 ∧ true) 
c  in CNF:
c    -b^{146, 3}_2 ∨ -b^{146, 3}_1 ∨ -b^{146, 3}_0 ∨ false 
c  in DIMACS:
-20771 -20772 -20773  0

c i = 4
c  -2+1 --> -1
c    ( b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧  p_584) -> ( b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0)
c  in CNF:
c    -b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨  b^{146, 5}_2
c    -b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_1
c    -b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨  b^{146, 5}_0
c  in DIMACS:
-20774 -20775  20776 -584  20777 0
-20774 -20775  20776 -584 -20778 0
-20774 -20775  20776 -584  20779 0

c  -1+1 --> 0
c    ( b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0 ∧  p_584) -> (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧ -b^{146, 5}_0)
c  in CNF:
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_2
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_1
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_0
c  in DIMACS:
-20774  20775 -20776 -584 -20777 0
-20774  20775 -20776 -584 -20778 0
-20774  20775 -20776 -584 -20779 0

c  0+1 --> 1
c    (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧  p_584) -> (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0)
c  in CNF:
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_2
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_1
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨  b^{146, 5}_0
c  in DIMACS:
 20774  20775  20776 -584 -20777 0
 20774  20775  20776 -584 -20778 0
 20774  20775  20776 -584  20779 0

c  1+1 --> 2
c    (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0 ∧  p_584) -> (-b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0)
c  in CNF:
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_2
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨  b^{146, 5}_1
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ -p_584 ∨ -b^{146, 5}_0
c  in DIMACS:
 20774  20775 -20776 -584 -20777 0
 20774  20775 -20776 -584  20778 0
 20774  20775 -20776 -584 -20779 0

c  2+1 --> break 
c    (-b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧  p_584) -> break
c  in CNF:
c     b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 20774 -20775  20776 -584 1162 0


c  2-1 --> 1
c    (-b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧ -p_584) -> (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0)
c  in CNF:
c     b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_2
c     b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_1
c     b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨  b^{146, 5}_0
c  in DIMACS:
 20774 -20775  20776  584 -20777 0
 20774 -20775  20776  584 -20778 0
 20774 -20775  20776  584  20779 0

c  1-1 --> 0
c    (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0 ∧ -p_584) -> (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧ -b^{146, 5}_0)
c  in CNF:
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_2
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_1
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_0
c  in DIMACS:
 20774  20775 -20776  584 -20777 0
 20774  20775 -20776  584 -20778 0
 20774  20775 -20776  584 -20779 0

c  0-1 --> -1
c    (-b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧ -p_584) -> ( b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0)
c  in CNF:
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨  b^{146, 5}_2
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_1
c     b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨  b^{146, 5}_0
c  in DIMACS:
 20774  20775  20776  584  20777 0
 20774  20775  20776  584 -20778 0
 20774  20775  20776  584  20779 0

c  -1-1 --> -2
c    ( b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧  b^{146, 4}_0 ∧ -p_584) -> ( b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0)
c  in CNF:
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨  b^{146, 5}_2
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨  b^{146, 5}_1
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨  p_584 ∨ -b^{146, 5}_0
c  in DIMACS:
-20774  20775 -20776  584  20777 0
-20774  20775 -20776  584  20778 0
-20774  20775 -20776  584 -20779 0

c  -2-1 --> break 
c    ( b^{146, 4}_2 ∧  b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨  b^{146, 4}_0 ∨  p_584 ∨ break
c  in DIMACS:
-20774 -20775  20776  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 4}_2 ∧ -b^{146, 4}_1 ∧ -b^{146, 4}_0 ∧ true) 
c  in CNF:
c    -b^{146, 4}_2 ∨  b^{146, 4}_1 ∨  b^{146, 4}_0 ∨ false 
c  in DIMACS:
-20774  20775  20776  0

c  3 does not represent an automaton state.
c    -(-b^{146, 4}_2 ∧  b^{146, 4}_1 ∧  b^{146, 4}_0 ∧ true) 
c  in CNF:
c     b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ false 
c  in DIMACS:
 20774 -20775 -20776  0
c  -3 does not represent an automaton state.
c    -( b^{146, 4}_2 ∧  b^{146, 4}_1 ∧  b^{146, 4}_0 ∧ true) 
c  in CNF:
c    -b^{146, 4}_2 ∨ -b^{146, 4}_1 ∨ -b^{146, 4}_0 ∨ false 
c  in DIMACS:
-20774 -20775 -20776  0

c i = 5
c  -2+1 --> -1
c    ( b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧  p_730) -> ( b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0)
c  in CNF:
c    -b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨  b^{146, 6}_2
c    -b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_1
c    -b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨  b^{146, 6}_0
c  in DIMACS:
-20777 -20778  20779 -730  20780 0
-20777 -20778  20779 -730 -20781 0
-20777 -20778  20779 -730  20782 0

c  -1+1 --> 0
c    ( b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0 ∧  p_730) -> (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧ -b^{146, 6}_0)
c  in CNF:
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_2
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_1
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_0
c  in DIMACS:
-20777  20778 -20779 -730 -20780 0
-20777  20778 -20779 -730 -20781 0
-20777  20778 -20779 -730 -20782 0

c  0+1 --> 1
c    (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧  p_730) -> (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0)
c  in CNF:
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_2
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_1
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨  b^{146, 6}_0
c  in DIMACS:
 20777  20778  20779 -730 -20780 0
 20777  20778  20779 -730 -20781 0
 20777  20778  20779 -730  20782 0

c  1+1 --> 2
c    (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0 ∧  p_730) -> (-b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0)
c  in CNF:
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_2
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨  b^{146, 6}_1
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ -p_730 ∨ -b^{146, 6}_0
c  in DIMACS:
 20777  20778 -20779 -730 -20780 0
 20777  20778 -20779 -730  20781 0
 20777  20778 -20779 -730 -20782 0

c  2+1 --> break 
c    (-b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧  p_730) -> break
c  in CNF:
c     b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 20777 -20778  20779 -730 1162 0


c  2-1 --> 1
c    (-b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧ -p_730) -> (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0)
c  in CNF:
c     b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_2
c     b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_1
c     b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨  b^{146, 6}_0
c  in DIMACS:
 20777 -20778  20779  730 -20780 0
 20777 -20778  20779  730 -20781 0
 20777 -20778  20779  730  20782 0

c  1-1 --> 0
c    (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0 ∧ -p_730) -> (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧ -b^{146, 6}_0)
c  in CNF:
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_2
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_1
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_0
c  in DIMACS:
 20777  20778 -20779  730 -20780 0
 20777  20778 -20779  730 -20781 0
 20777  20778 -20779  730 -20782 0

c  0-1 --> -1
c    (-b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧ -p_730) -> ( b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0)
c  in CNF:
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨  b^{146, 6}_2
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_1
c     b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨  b^{146, 6}_0
c  in DIMACS:
 20777  20778  20779  730  20780 0
 20777  20778  20779  730 -20781 0
 20777  20778  20779  730  20782 0

c  -1-1 --> -2
c    ( b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧  b^{146, 5}_0 ∧ -p_730) -> ( b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0)
c  in CNF:
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨  b^{146, 6}_2
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨  b^{146, 6}_1
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨  p_730 ∨ -b^{146, 6}_0
c  in DIMACS:
-20777  20778 -20779  730  20780 0
-20777  20778 -20779  730  20781 0
-20777  20778 -20779  730 -20782 0

c  -2-1 --> break 
c    ( b^{146, 5}_2 ∧  b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨  b^{146, 5}_0 ∨  p_730 ∨ break
c  in DIMACS:
-20777 -20778  20779  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 5}_2 ∧ -b^{146, 5}_1 ∧ -b^{146, 5}_0 ∧ true) 
c  in CNF:
c    -b^{146, 5}_2 ∨  b^{146, 5}_1 ∨  b^{146, 5}_0 ∨ false 
c  in DIMACS:
-20777  20778  20779  0

c  3 does not represent an automaton state.
c    -(-b^{146, 5}_2 ∧  b^{146, 5}_1 ∧  b^{146, 5}_0 ∧ true) 
c  in CNF:
c     b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ false 
c  in DIMACS:
 20777 -20778 -20779  0
c  -3 does not represent an automaton state.
c    -( b^{146, 5}_2 ∧  b^{146, 5}_1 ∧  b^{146, 5}_0 ∧ true) 
c  in CNF:
c    -b^{146, 5}_2 ∨ -b^{146, 5}_1 ∨ -b^{146, 5}_0 ∨ false 
c  in DIMACS:
-20777 -20778 -20779  0

c i = 6
c  -2+1 --> -1
c    ( b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧  p_876) -> ( b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0)
c  in CNF:
c    -b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨  b^{146, 7}_2
c    -b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_1
c    -b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨  b^{146, 7}_0
c  in DIMACS:
-20780 -20781  20782 -876  20783 0
-20780 -20781  20782 -876 -20784 0
-20780 -20781  20782 -876  20785 0

c  -1+1 --> 0
c    ( b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0 ∧  p_876) -> (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧ -b^{146, 7}_0)
c  in CNF:
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_2
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_1
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_0
c  in DIMACS:
-20780  20781 -20782 -876 -20783 0
-20780  20781 -20782 -876 -20784 0
-20780  20781 -20782 -876 -20785 0

c  0+1 --> 1
c    (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧  p_876) -> (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0)
c  in CNF:
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_2
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_1
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨  b^{146, 7}_0
c  in DIMACS:
 20780  20781  20782 -876 -20783 0
 20780  20781  20782 -876 -20784 0
 20780  20781  20782 -876  20785 0

c  1+1 --> 2
c    (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0 ∧  p_876) -> (-b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0)
c  in CNF:
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_2
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨  b^{146, 7}_1
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ -p_876 ∨ -b^{146, 7}_0
c  in DIMACS:
 20780  20781 -20782 -876 -20783 0
 20780  20781 -20782 -876  20784 0
 20780  20781 -20782 -876 -20785 0

c  2+1 --> break 
c    (-b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧  p_876) -> break
c  in CNF:
c     b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 20780 -20781  20782 -876 1162 0


c  2-1 --> 1
c    (-b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧ -p_876) -> (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0)
c  in CNF:
c     b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_2
c     b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_1
c     b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨  b^{146, 7}_0
c  in DIMACS:
 20780 -20781  20782  876 -20783 0
 20780 -20781  20782  876 -20784 0
 20780 -20781  20782  876  20785 0

c  1-1 --> 0
c    (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0 ∧ -p_876) -> (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧ -b^{146, 7}_0)
c  in CNF:
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_2
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_1
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_0
c  in DIMACS:
 20780  20781 -20782  876 -20783 0
 20780  20781 -20782  876 -20784 0
 20780  20781 -20782  876 -20785 0

c  0-1 --> -1
c    (-b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧ -p_876) -> ( b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0)
c  in CNF:
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨  b^{146, 7}_2
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_1
c     b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨  b^{146, 7}_0
c  in DIMACS:
 20780  20781  20782  876  20783 0
 20780  20781  20782  876 -20784 0
 20780  20781  20782  876  20785 0

c  -1-1 --> -2
c    ( b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧  b^{146, 6}_0 ∧ -p_876) -> ( b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0)
c  in CNF:
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨  b^{146, 7}_2
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨  b^{146, 7}_1
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨  p_876 ∨ -b^{146, 7}_0
c  in DIMACS:
-20780  20781 -20782  876  20783 0
-20780  20781 -20782  876  20784 0
-20780  20781 -20782  876 -20785 0

c  -2-1 --> break 
c    ( b^{146, 6}_2 ∧  b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨  b^{146, 6}_0 ∨  p_876 ∨ break
c  in DIMACS:
-20780 -20781  20782  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 6}_2 ∧ -b^{146, 6}_1 ∧ -b^{146, 6}_0 ∧ true) 
c  in CNF:
c    -b^{146, 6}_2 ∨  b^{146, 6}_1 ∨  b^{146, 6}_0 ∨ false 
c  in DIMACS:
-20780  20781  20782  0

c  3 does not represent an automaton state.
c    -(-b^{146, 6}_2 ∧  b^{146, 6}_1 ∧  b^{146, 6}_0 ∧ true) 
c  in CNF:
c     b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ false 
c  in DIMACS:
 20780 -20781 -20782  0
c  -3 does not represent an automaton state.
c    -( b^{146, 6}_2 ∧  b^{146, 6}_1 ∧  b^{146, 6}_0 ∧ true) 
c  in CNF:
c    -b^{146, 6}_2 ∨ -b^{146, 6}_1 ∨ -b^{146, 6}_0 ∨ false 
c  in DIMACS:
-20780 -20781 -20782  0

c i = 7
c  -2+1 --> -1
c    ( b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧  p_1022) -> ( b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧  b^{146, 8}_0)
c  in CNF:
c    -b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨  b^{146, 8}_2
c    -b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_1
c    -b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨  b^{146, 8}_0
c  in DIMACS:
-20783 -20784  20785 -1022  20786 0
-20783 -20784  20785 -1022 -20787 0
-20783 -20784  20785 -1022  20788 0

c  -1+1 --> 0
c    ( b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0 ∧  p_1022) -> (-b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧ -b^{146, 8}_0)
c  in CNF:
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_2
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_1
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_0
c  in DIMACS:
-20783  20784 -20785 -1022 -20786 0
-20783  20784 -20785 -1022 -20787 0
-20783  20784 -20785 -1022 -20788 0

c  0+1 --> 1
c    (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧  p_1022) -> (-b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧  b^{146, 8}_0)
c  in CNF:
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_2
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_1
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨  b^{146, 8}_0
c  in DIMACS:
 20783  20784  20785 -1022 -20786 0
 20783  20784  20785 -1022 -20787 0
 20783  20784  20785 -1022  20788 0

c  1+1 --> 2
c    (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0 ∧  p_1022) -> (-b^{146, 8}_2 ∧  b^{146, 8}_1 ∧ -b^{146, 8}_0)
c  in CNF:
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_2
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨  b^{146, 8}_1
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ -p_1022 ∨ -b^{146, 8}_0
c  in DIMACS:
 20783  20784 -20785 -1022 -20786 0
 20783  20784 -20785 -1022  20787 0
 20783  20784 -20785 -1022 -20788 0

c  2+1 --> break 
c    (-b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧  p_1022) -> break
c  in CNF:
c     b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ -p_1022 ∨ break
c  in DIMACS:
 20783 -20784  20785 -1022 1162 0


c  2-1 --> 1
c    (-b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧ -p_1022) -> (-b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧  b^{146, 8}_0)
c  in CNF:
c     b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_2
c     b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_1
c     b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨  b^{146, 8}_0
c  in DIMACS:
 20783 -20784  20785  1022 -20786 0
 20783 -20784  20785  1022 -20787 0
 20783 -20784  20785  1022  20788 0

c  1-1 --> 0
c    (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0 ∧ -p_1022) -> (-b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧ -b^{146, 8}_0)
c  in CNF:
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_2
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_1
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_0
c  in DIMACS:
 20783  20784 -20785  1022 -20786 0
 20783  20784 -20785  1022 -20787 0
 20783  20784 -20785  1022 -20788 0

c  0-1 --> -1
c    (-b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧ -p_1022) -> ( b^{146, 8}_2 ∧ -b^{146, 8}_1 ∧  b^{146, 8}_0)
c  in CNF:
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨  b^{146, 8}_2
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_1
c     b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨  b^{146, 8}_0
c  in DIMACS:
 20783  20784  20785  1022  20786 0
 20783  20784  20785  1022 -20787 0
 20783  20784  20785  1022  20788 0

c  -1-1 --> -2
c    ( b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧  b^{146, 7}_0 ∧ -p_1022) -> ( b^{146, 8}_2 ∧  b^{146, 8}_1 ∧ -b^{146, 8}_0)
c  in CNF:
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨  b^{146, 8}_2
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨  b^{146, 8}_1
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨  p_1022 ∨ -b^{146, 8}_0
c  in DIMACS:
-20783  20784 -20785  1022  20786 0
-20783  20784 -20785  1022  20787 0
-20783  20784 -20785  1022 -20788 0

c  -2-1 --> break 
c    ( b^{146, 7}_2 ∧  b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧ -p_1022) -> break
c  in CNF:
c    -b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨  b^{146, 7}_0 ∨  p_1022 ∨ break
c  in DIMACS:
-20783 -20784  20785  1022 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{146, 7}_2 ∧ -b^{146, 7}_1 ∧ -b^{146, 7}_0 ∧ true) 
c  in CNF:
c    -b^{146, 7}_2 ∨  b^{146, 7}_1 ∨  b^{146, 7}_0 ∨ false 
c  in DIMACS:
-20783  20784  20785  0

c  3 does not represent an automaton state.
c    -(-b^{146, 7}_2 ∧  b^{146, 7}_1 ∧  b^{146, 7}_0 ∧ true) 
c  in CNF:
c     b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ false 
c  in DIMACS:
 20783 -20784 -20785  0
c  -3 does not represent an automaton state.
c    -( b^{146, 7}_2 ∧  b^{146, 7}_1 ∧  b^{146, 7}_0 ∧ true) 
c  in CNF:
c    -b^{146, 7}_2 ∨ -b^{146, 7}_1 ∨ -b^{146, 7}_0 ∨ false 
c  in DIMACS:
-20783 -20784 -20785  0

c INIT for k = 147
c    -b^{147, 1}_2
c    -b^{147, 1}_1
c    -b^{147, 1}_0
c  in DIMACS:
-20789 0
-20790 0
-20791 0

c Transitions for k = 147
c i = 1
c  -2+1 --> -1
c    ( b^{147, 1}_2 ∧  b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧  p_147) -> ( b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0)
c  in CNF:
c    -b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨  b^{147, 2}_2
c    -b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_1
c    -b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨  b^{147, 2}_0
c  in DIMACS:
-20789 -20790  20791 -147  20792 0
-20789 -20790  20791 -147 -20793 0
-20789 -20790  20791 -147  20794 0

c  -1+1 --> 0
c    ( b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧  b^{147, 1}_0 ∧  p_147) -> (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧ -b^{147, 2}_0)
c  in CNF:
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_2
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_1
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_0
c  in DIMACS:
-20789  20790 -20791 -147 -20792 0
-20789  20790 -20791 -147 -20793 0
-20789  20790 -20791 -147 -20794 0

c  0+1 --> 1
c    (-b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧  p_147) -> (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0)
c  in CNF:
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_2
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_1
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨  b^{147, 2}_0
c  in DIMACS:
 20789  20790  20791 -147 -20792 0
 20789  20790  20791 -147 -20793 0
 20789  20790  20791 -147  20794 0

c  1+1 --> 2
c    (-b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧  b^{147, 1}_0 ∧  p_147) -> (-b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0)
c  in CNF:
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_2
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨  b^{147, 2}_1
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ -p_147 ∨ -b^{147, 2}_0
c  in DIMACS:
 20789  20790 -20791 -147 -20792 0
 20789  20790 -20791 -147  20793 0
 20789  20790 -20791 -147 -20794 0

c  2+1 --> break 
c    (-b^{147, 1}_2 ∧  b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧  p_147) -> break
c  in CNF:
c     b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ -p_147 ∨ break
c  in DIMACS:
 20789 -20790  20791 -147 1162 0


c  2-1 --> 1
c    (-b^{147, 1}_2 ∧  b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧ -p_147) -> (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0)
c  in CNF:
c     b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_2
c     b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_1
c     b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨  b^{147, 2}_0
c  in DIMACS:
 20789 -20790  20791  147 -20792 0
 20789 -20790  20791  147 -20793 0
 20789 -20790  20791  147  20794 0

c  1-1 --> 0
c    (-b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧  b^{147, 1}_0 ∧ -p_147) -> (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧ -b^{147, 2}_0)
c  in CNF:
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_2
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_1
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_0
c  in DIMACS:
 20789  20790 -20791  147 -20792 0
 20789  20790 -20791  147 -20793 0
 20789  20790 -20791  147 -20794 0

c  0-1 --> -1
c    (-b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧ -p_147) -> ( b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0)
c  in CNF:
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨  b^{147, 2}_2
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_1
c     b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨  b^{147, 2}_0
c  in DIMACS:
 20789  20790  20791  147  20792 0
 20789  20790  20791  147 -20793 0
 20789  20790  20791  147  20794 0

c  -1-1 --> -2
c    ( b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧  b^{147, 1}_0 ∧ -p_147) -> ( b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0)
c  in CNF:
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨  b^{147, 2}_2
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨  b^{147, 2}_1
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨  p_147 ∨ -b^{147, 2}_0
c  in DIMACS:
-20789  20790 -20791  147  20792 0
-20789  20790 -20791  147  20793 0
-20789  20790 -20791  147 -20794 0

c  -2-1 --> break 
c    ( b^{147, 1}_2 ∧  b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧ -p_147) -> break
c  in CNF:
c    -b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨  b^{147, 1}_0 ∨  p_147 ∨ break
c  in DIMACS:
-20789 -20790  20791  147 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 1}_2 ∧ -b^{147, 1}_1 ∧ -b^{147, 1}_0 ∧ true) 
c  in CNF:
c    -b^{147, 1}_2 ∨  b^{147, 1}_1 ∨  b^{147, 1}_0 ∨ false 
c  in DIMACS:
-20789  20790  20791  0

c  3 does not represent an automaton state.
c    -(-b^{147, 1}_2 ∧  b^{147, 1}_1 ∧  b^{147, 1}_0 ∧ true) 
c  in CNF:
c     b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ false 
c  in DIMACS:
 20789 -20790 -20791  0
c  -3 does not represent an automaton state.
c    -( b^{147, 1}_2 ∧  b^{147, 1}_1 ∧  b^{147, 1}_0 ∧ true) 
c  in CNF:
c    -b^{147, 1}_2 ∨ -b^{147, 1}_1 ∨ -b^{147, 1}_0 ∨ false 
c  in DIMACS:
-20789 -20790 -20791  0

c i = 2
c  -2+1 --> -1
c    ( b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧  p_294) -> ( b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0)
c  in CNF:
c    -b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨  b^{147, 3}_2
c    -b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_1
c    -b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨  b^{147, 3}_0
c  in DIMACS:
-20792 -20793  20794 -294  20795 0
-20792 -20793  20794 -294 -20796 0
-20792 -20793  20794 -294  20797 0

c  -1+1 --> 0
c    ( b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0 ∧  p_294) -> (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧ -b^{147, 3}_0)
c  in CNF:
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_2
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_1
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_0
c  in DIMACS:
-20792  20793 -20794 -294 -20795 0
-20792  20793 -20794 -294 -20796 0
-20792  20793 -20794 -294 -20797 0

c  0+1 --> 1
c    (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧  p_294) -> (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0)
c  in CNF:
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_2
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_1
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨  b^{147, 3}_0
c  in DIMACS:
 20792  20793  20794 -294 -20795 0
 20792  20793  20794 -294 -20796 0
 20792  20793  20794 -294  20797 0

c  1+1 --> 2
c    (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0 ∧  p_294) -> (-b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0)
c  in CNF:
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_2
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨  b^{147, 3}_1
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ -p_294 ∨ -b^{147, 3}_0
c  in DIMACS:
 20792  20793 -20794 -294 -20795 0
 20792  20793 -20794 -294  20796 0
 20792  20793 -20794 -294 -20797 0

c  2+1 --> break 
c    (-b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧  p_294) -> break
c  in CNF:
c     b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 20792 -20793  20794 -294 1162 0


c  2-1 --> 1
c    (-b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧ -p_294) -> (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0)
c  in CNF:
c     b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_2
c     b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_1
c     b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨  b^{147, 3}_0
c  in DIMACS:
 20792 -20793  20794  294 -20795 0
 20792 -20793  20794  294 -20796 0
 20792 -20793  20794  294  20797 0

c  1-1 --> 0
c    (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0 ∧ -p_294) -> (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧ -b^{147, 3}_0)
c  in CNF:
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_2
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_1
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_0
c  in DIMACS:
 20792  20793 -20794  294 -20795 0
 20792  20793 -20794  294 -20796 0
 20792  20793 -20794  294 -20797 0

c  0-1 --> -1
c    (-b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧ -p_294) -> ( b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0)
c  in CNF:
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨  b^{147, 3}_2
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_1
c     b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨  b^{147, 3}_0
c  in DIMACS:
 20792  20793  20794  294  20795 0
 20792  20793  20794  294 -20796 0
 20792  20793  20794  294  20797 0

c  -1-1 --> -2
c    ( b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧  b^{147, 2}_0 ∧ -p_294) -> ( b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0)
c  in CNF:
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨  b^{147, 3}_2
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨  b^{147, 3}_1
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨  p_294 ∨ -b^{147, 3}_0
c  in DIMACS:
-20792  20793 -20794  294  20795 0
-20792  20793 -20794  294  20796 0
-20792  20793 -20794  294 -20797 0

c  -2-1 --> break 
c    ( b^{147, 2}_2 ∧  b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨  b^{147, 2}_0 ∨  p_294 ∨ break
c  in DIMACS:
-20792 -20793  20794  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 2}_2 ∧ -b^{147, 2}_1 ∧ -b^{147, 2}_0 ∧ true) 
c  in CNF:
c    -b^{147, 2}_2 ∨  b^{147, 2}_1 ∨  b^{147, 2}_0 ∨ false 
c  in DIMACS:
-20792  20793  20794  0

c  3 does not represent an automaton state.
c    -(-b^{147, 2}_2 ∧  b^{147, 2}_1 ∧  b^{147, 2}_0 ∧ true) 
c  in CNF:
c     b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ false 
c  in DIMACS:
 20792 -20793 -20794  0
c  -3 does not represent an automaton state.
c    -( b^{147, 2}_2 ∧  b^{147, 2}_1 ∧  b^{147, 2}_0 ∧ true) 
c  in CNF:
c    -b^{147, 2}_2 ∨ -b^{147, 2}_1 ∨ -b^{147, 2}_0 ∨ false 
c  in DIMACS:
-20792 -20793 -20794  0

c i = 3
c  -2+1 --> -1
c    ( b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧  p_441) -> ( b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0)
c  in CNF:
c    -b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨  b^{147, 4}_2
c    -b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_1
c    -b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨  b^{147, 4}_0
c  in DIMACS:
-20795 -20796  20797 -441  20798 0
-20795 -20796  20797 -441 -20799 0
-20795 -20796  20797 -441  20800 0

c  -1+1 --> 0
c    ( b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0 ∧  p_441) -> (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧ -b^{147, 4}_0)
c  in CNF:
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_2
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_1
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_0
c  in DIMACS:
-20795  20796 -20797 -441 -20798 0
-20795  20796 -20797 -441 -20799 0
-20795  20796 -20797 -441 -20800 0

c  0+1 --> 1
c    (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧  p_441) -> (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0)
c  in CNF:
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_2
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_1
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨  b^{147, 4}_0
c  in DIMACS:
 20795  20796  20797 -441 -20798 0
 20795  20796  20797 -441 -20799 0
 20795  20796  20797 -441  20800 0

c  1+1 --> 2
c    (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0 ∧  p_441) -> (-b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0)
c  in CNF:
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_2
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨  b^{147, 4}_1
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ -p_441 ∨ -b^{147, 4}_0
c  in DIMACS:
 20795  20796 -20797 -441 -20798 0
 20795  20796 -20797 -441  20799 0
 20795  20796 -20797 -441 -20800 0

c  2+1 --> break 
c    (-b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧  p_441) -> break
c  in CNF:
c     b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ -p_441 ∨ break
c  in DIMACS:
 20795 -20796  20797 -441 1162 0


c  2-1 --> 1
c    (-b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧ -p_441) -> (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0)
c  in CNF:
c     b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_2
c     b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_1
c     b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨  b^{147, 4}_0
c  in DIMACS:
 20795 -20796  20797  441 -20798 0
 20795 -20796  20797  441 -20799 0
 20795 -20796  20797  441  20800 0

c  1-1 --> 0
c    (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0 ∧ -p_441) -> (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧ -b^{147, 4}_0)
c  in CNF:
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_2
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_1
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_0
c  in DIMACS:
 20795  20796 -20797  441 -20798 0
 20795  20796 -20797  441 -20799 0
 20795  20796 -20797  441 -20800 0

c  0-1 --> -1
c    (-b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧ -p_441) -> ( b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0)
c  in CNF:
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨  b^{147, 4}_2
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_1
c     b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨  b^{147, 4}_0
c  in DIMACS:
 20795  20796  20797  441  20798 0
 20795  20796  20797  441 -20799 0
 20795  20796  20797  441  20800 0

c  -1-1 --> -2
c    ( b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧  b^{147, 3}_0 ∧ -p_441) -> ( b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0)
c  in CNF:
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨  b^{147, 4}_2
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨  b^{147, 4}_1
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨  p_441 ∨ -b^{147, 4}_0
c  in DIMACS:
-20795  20796 -20797  441  20798 0
-20795  20796 -20797  441  20799 0
-20795  20796 -20797  441 -20800 0

c  -2-1 --> break 
c    ( b^{147, 3}_2 ∧  b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧ -p_441) -> break
c  in CNF:
c    -b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨  b^{147, 3}_0 ∨  p_441 ∨ break
c  in DIMACS:
-20795 -20796  20797  441 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 3}_2 ∧ -b^{147, 3}_1 ∧ -b^{147, 3}_0 ∧ true) 
c  in CNF:
c    -b^{147, 3}_2 ∨  b^{147, 3}_1 ∨  b^{147, 3}_0 ∨ false 
c  in DIMACS:
-20795  20796  20797  0

c  3 does not represent an automaton state.
c    -(-b^{147, 3}_2 ∧  b^{147, 3}_1 ∧  b^{147, 3}_0 ∧ true) 
c  in CNF:
c     b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ false 
c  in DIMACS:
 20795 -20796 -20797  0
c  -3 does not represent an automaton state.
c    -( b^{147, 3}_2 ∧  b^{147, 3}_1 ∧  b^{147, 3}_0 ∧ true) 
c  in CNF:
c    -b^{147, 3}_2 ∨ -b^{147, 3}_1 ∨ -b^{147, 3}_0 ∨ false 
c  in DIMACS:
-20795 -20796 -20797  0

c i = 4
c  -2+1 --> -1
c    ( b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧  p_588) -> ( b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0)
c  in CNF:
c    -b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨  b^{147, 5}_2
c    -b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_1
c    -b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨  b^{147, 5}_0
c  in DIMACS:
-20798 -20799  20800 -588  20801 0
-20798 -20799  20800 -588 -20802 0
-20798 -20799  20800 -588  20803 0

c  -1+1 --> 0
c    ( b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0 ∧  p_588) -> (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧ -b^{147, 5}_0)
c  in CNF:
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_2
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_1
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_0
c  in DIMACS:
-20798  20799 -20800 -588 -20801 0
-20798  20799 -20800 -588 -20802 0
-20798  20799 -20800 -588 -20803 0

c  0+1 --> 1
c    (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧  p_588) -> (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0)
c  in CNF:
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_2
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_1
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨  b^{147, 5}_0
c  in DIMACS:
 20798  20799  20800 -588 -20801 0
 20798  20799  20800 -588 -20802 0
 20798  20799  20800 -588  20803 0

c  1+1 --> 2
c    (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0 ∧  p_588) -> (-b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0)
c  in CNF:
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_2
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨  b^{147, 5}_1
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ -p_588 ∨ -b^{147, 5}_0
c  in DIMACS:
 20798  20799 -20800 -588 -20801 0
 20798  20799 -20800 -588  20802 0
 20798  20799 -20800 -588 -20803 0

c  2+1 --> break 
c    (-b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧  p_588) -> break
c  in CNF:
c     b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 20798 -20799  20800 -588 1162 0


c  2-1 --> 1
c    (-b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧ -p_588) -> (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0)
c  in CNF:
c     b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_2
c     b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_1
c     b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨  b^{147, 5}_0
c  in DIMACS:
 20798 -20799  20800  588 -20801 0
 20798 -20799  20800  588 -20802 0
 20798 -20799  20800  588  20803 0

c  1-1 --> 0
c    (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0 ∧ -p_588) -> (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧ -b^{147, 5}_0)
c  in CNF:
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_2
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_1
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_0
c  in DIMACS:
 20798  20799 -20800  588 -20801 0
 20798  20799 -20800  588 -20802 0
 20798  20799 -20800  588 -20803 0

c  0-1 --> -1
c    (-b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧ -p_588) -> ( b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0)
c  in CNF:
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨  b^{147, 5}_2
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_1
c     b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨  b^{147, 5}_0
c  in DIMACS:
 20798  20799  20800  588  20801 0
 20798  20799  20800  588 -20802 0
 20798  20799  20800  588  20803 0

c  -1-1 --> -2
c    ( b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧  b^{147, 4}_0 ∧ -p_588) -> ( b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0)
c  in CNF:
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨  b^{147, 5}_2
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨  b^{147, 5}_1
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨  p_588 ∨ -b^{147, 5}_0
c  in DIMACS:
-20798  20799 -20800  588  20801 0
-20798  20799 -20800  588  20802 0
-20798  20799 -20800  588 -20803 0

c  -2-1 --> break 
c    ( b^{147, 4}_2 ∧  b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨  b^{147, 4}_0 ∨  p_588 ∨ break
c  in DIMACS:
-20798 -20799  20800  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 4}_2 ∧ -b^{147, 4}_1 ∧ -b^{147, 4}_0 ∧ true) 
c  in CNF:
c    -b^{147, 4}_2 ∨  b^{147, 4}_1 ∨  b^{147, 4}_0 ∨ false 
c  in DIMACS:
-20798  20799  20800  0

c  3 does not represent an automaton state.
c    -(-b^{147, 4}_2 ∧  b^{147, 4}_1 ∧  b^{147, 4}_0 ∧ true) 
c  in CNF:
c     b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ false 
c  in DIMACS:
 20798 -20799 -20800  0
c  -3 does not represent an automaton state.
c    -( b^{147, 4}_2 ∧  b^{147, 4}_1 ∧  b^{147, 4}_0 ∧ true) 
c  in CNF:
c    -b^{147, 4}_2 ∨ -b^{147, 4}_1 ∨ -b^{147, 4}_0 ∨ false 
c  in DIMACS:
-20798 -20799 -20800  0

c i = 5
c  -2+1 --> -1
c    ( b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧  p_735) -> ( b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0)
c  in CNF:
c    -b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨  b^{147, 6}_2
c    -b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_1
c    -b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨  b^{147, 6}_0
c  in DIMACS:
-20801 -20802  20803 -735  20804 0
-20801 -20802  20803 -735 -20805 0
-20801 -20802  20803 -735  20806 0

c  -1+1 --> 0
c    ( b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0 ∧  p_735) -> (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧ -b^{147, 6}_0)
c  in CNF:
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_2
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_1
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_0
c  in DIMACS:
-20801  20802 -20803 -735 -20804 0
-20801  20802 -20803 -735 -20805 0
-20801  20802 -20803 -735 -20806 0

c  0+1 --> 1
c    (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧  p_735) -> (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0)
c  in CNF:
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_2
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_1
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨  b^{147, 6}_0
c  in DIMACS:
 20801  20802  20803 -735 -20804 0
 20801  20802  20803 -735 -20805 0
 20801  20802  20803 -735  20806 0

c  1+1 --> 2
c    (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0 ∧  p_735) -> (-b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0)
c  in CNF:
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_2
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨  b^{147, 6}_1
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ -p_735 ∨ -b^{147, 6}_0
c  in DIMACS:
 20801  20802 -20803 -735 -20804 0
 20801  20802 -20803 -735  20805 0
 20801  20802 -20803 -735 -20806 0

c  2+1 --> break 
c    (-b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧  p_735) -> break
c  in CNF:
c     b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 20801 -20802  20803 -735 1162 0


c  2-1 --> 1
c    (-b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧ -p_735) -> (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0)
c  in CNF:
c     b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_2
c     b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_1
c     b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨  b^{147, 6}_0
c  in DIMACS:
 20801 -20802  20803  735 -20804 0
 20801 -20802  20803  735 -20805 0
 20801 -20802  20803  735  20806 0

c  1-1 --> 0
c    (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0 ∧ -p_735) -> (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧ -b^{147, 6}_0)
c  in CNF:
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_2
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_1
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_0
c  in DIMACS:
 20801  20802 -20803  735 -20804 0
 20801  20802 -20803  735 -20805 0
 20801  20802 -20803  735 -20806 0

c  0-1 --> -1
c    (-b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧ -p_735) -> ( b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0)
c  in CNF:
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨  b^{147, 6}_2
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_1
c     b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨  b^{147, 6}_0
c  in DIMACS:
 20801  20802  20803  735  20804 0
 20801  20802  20803  735 -20805 0
 20801  20802  20803  735  20806 0

c  -1-1 --> -2
c    ( b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧  b^{147, 5}_0 ∧ -p_735) -> ( b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0)
c  in CNF:
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨  b^{147, 6}_2
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨  b^{147, 6}_1
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨  p_735 ∨ -b^{147, 6}_0
c  in DIMACS:
-20801  20802 -20803  735  20804 0
-20801  20802 -20803  735  20805 0
-20801  20802 -20803  735 -20806 0

c  -2-1 --> break 
c    ( b^{147, 5}_2 ∧  b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨  b^{147, 5}_0 ∨  p_735 ∨ break
c  in DIMACS:
-20801 -20802  20803  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 5}_2 ∧ -b^{147, 5}_1 ∧ -b^{147, 5}_0 ∧ true) 
c  in CNF:
c    -b^{147, 5}_2 ∨  b^{147, 5}_1 ∨  b^{147, 5}_0 ∨ false 
c  in DIMACS:
-20801  20802  20803  0

c  3 does not represent an automaton state.
c    -(-b^{147, 5}_2 ∧  b^{147, 5}_1 ∧  b^{147, 5}_0 ∧ true) 
c  in CNF:
c     b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ false 
c  in DIMACS:
 20801 -20802 -20803  0
c  -3 does not represent an automaton state.
c    -( b^{147, 5}_2 ∧  b^{147, 5}_1 ∧  b^{147, 5}_0 ∧ true) 
c  in CNF:
c    -b^{147, 5}_2 ∨ -b^{147, 5}_1 ∨ -b^{147, 5}_0 ∨ false 
c  in DIMACS:
-20801 -20802 -20803  0

c i = 6
c  -2+1 --> -1
c    ( b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧  p_882) -> ( b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0)
c  in CNF:
c    -b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨  b^{147, 7}_2
c    -b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_1
c    -b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨  b^{147, 7}_0
c  in DIMACS:
-20804 -20805  20806 -882  20807 0
-20804 -20805  20806 -882 -20808 0
-20804 -20805  20806 -882  20809 0

c  -1+1 --> 0
c    ( b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0 ∧  p_882) -> (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧ -b^{147, 7}_0)
c  in CNF:
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_2
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_1
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_0
c  in DIMACS:
-20804  20805 -20806 -882 -20807 0
-20804  20805 -20806 -882 -20808 0
-20804  20805 -20806 -882 -20809 0

c  0+1 --> 1
c    (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧  p_882) -> (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0)
c  in CNF:
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_2
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_1
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨  b^{147, 7}_0
c  in DIMACS:
 20804  20805  20806 -882 -20807 0
 20804  20805  20806 -882 -20808 0
 20804  20805  20806 -882  20809 0

c  1+1 --> 2
c    (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0 ∧  p_882) -> (-b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0)
c  in CNF:
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_2
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨  b^{147, 7}_1
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ -p_882 ∨ -b^{147, 7}_0
c  in DIMACS:
 20804  20805 -20806 -882 -20807 0
 20804  20805 -20806 -882  20808 0
 20804  20805 -20806 -882 -20809 0

c  2+1 --> break 
c    (-b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧  p_882) -> break
c  in CNF:
c     b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 20804 -20805  20806 -882 1162 0


c  2-1 --> 1
c    (-b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧ -p_882) -> (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0)
c  in CNF:
c     b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_2
c     b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_1
c     b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨  b^{147, 7}_0
c  in DIMACS:
 20804 -20805  20806  882 -20807 0
 20804 -20805  20806  882 -20808 0
 20804 -20805  20806  882  20809 0

c  1-1 --> 0
c    (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0 ∧ -p_882) -> (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧ -b^{147, 7}_0)
c  in CNF:
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_2
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_1
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_0
c  in DIMACS:
 20804  20805 -20806  882 -20807 0
 20804  20805 -20806  882 -20808 0
 20804  20805 -20806  882 -20809 0

c  0-1 --> -1
c    (-b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧ -p_882) -> ( b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0)
c  in CNF:
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨  b^{147, 7}_2
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_1
c     b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨  b^{147, 7}_0
c  in DIMACS:
 20804  20805  20806  882  20807 0
 20804  20805  20806  882 -20808 0
 20804  20805  20806  882  20809 0

c  -1-1 --> -2
c    ( b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧  b^{147, 6}_0 ∧ -p_882) -> ( b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0)
c  in CNF:
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨  b^{147, 7}_2
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨  b^{147, 7}_1
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨  p_882 ∨ -b^{147, 7}_0
c  in DIMACS:
-20804  20805 -20806  882  20807 0
-20804  20805 -20806  882  20808 0
-20804  20805 -20806  882 -20809 0

c  -2-1 --> break 
c    ( b^{147, 6}_2 ∧  b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨  b^{147, 6}_0 ∨  p_882 ∨ break
c  in DIMACS:
-20804 -20805  20806  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 6}_2 ∧ -b^{147, 6}_1 ∧ -b^{147, 6}_0 ∧ true) 
c  in CNF:
c    -b^{147, 6}_2 ∨  b^{147, 6}_1 ∨  b^{147, 6}_0 ∨ false 
c  in DIMACS:
-20804  20805  20806  0

c  3 does not represent an automaton state.
c    -(-b^{147, 6}_2 ∧  b^{147, 6}_1 ∧  b^{147, 6}_0 ∧ true) 
c  in CNF:
c     b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ false 
c  in DIMACS:
 20804 -20805 -20806  0
c  -3 does not represent an automaton state.
c    -( b^{147, 6}_2 ∧  b^{147, 6}_1 ∧  b^{147, 6}_0 ∧ true) 
c  in CNF:
c    -b^{147, 6}_2 ∨ -b^{147, 6}_1 ∨ -b^{147, 6}_0 ∨ false 
c  in DIMACS:
-20804 -20805 -20806  0

c i = 7
c  -2+1 --> -1
c    ( b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧  p_1029) -> ( b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧  b^{147, 8}_0)
c  in CNF:
c    -b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨  b^{147, 8}_2
c    -b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_1
c    -b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨  b^{147, 8}_0
c  in DIMACS:
-20807 -20808  20809 -1029  20810 0
-20807 -20808  20809 -1029 -20811 0
-20807 -20808  20809 -1029  20812 0

c  -1+1 --> 0
c    ( b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0 ∧  p_1029) -> (-b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧ -b^{147, 8}_0)
c  in CNF:
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_2
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_1
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_0
c  in DIMACS:
-20807  20808 -20809 -1029 -20810 0
-20807  20808 -20809 -1029 -20811 0
-20807  20808 -20809 -1029 -20812 0

c  0+1 --> 1
c    (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧  p_1029) -> (-b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧  b^{147, 8}_0)
c  in CNF:
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_2
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_1
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨  b^{147, 8}_0
c  in DIMACS:
 20807  20808  20809 -1029 -20810 0
 20807  20808  20809 -1029 -20811 0
 20807  20808  20809 -1029  20812 0

c  1+1 --> 2
c    (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0 ∧  p_1029) -> (-b^{147, 8}_2 ∧  b^{147, 8}_1 ∧ -b^{147, 8}_0)
c  in CNF:
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_2
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨  b^{147, 8}_1
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ -p_1029 ∨ -b^{147, 8}_0
c  in DIMACS:
 20807  20808 -20809 -1029 -20810 0
 20807  20808 -20809 -1029  20811 0
 20807  20808 -20809 -1029 -20812 0

c  2+1 --> break 
c    (-b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 20807 -20808  20809 -1029 1162 0


c  2-1 --> 1
c    (-b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧ -p_1029) -> (-b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧  b^{147, 8}_0)
c  in CNF:
c     b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_2
c     b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_1
c     b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨  b^{147, 8}_0
c  in DIMACS:
 20807 -20808  20809  1029 -20810 0
 20807 -20808  20809  1029 -20811 0
 20807 -20808  20809  1029  20812 0

c  1-1 --> 0
c    (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0 ∧ -p_1029) -> (-b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧ -b^{147, 8}_0)
c  in CNF:
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_2
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_1
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_0
c  in DIMACS:
 20807  20808 -20809  1029 -20810 0
 20807  20808 -20809  1029 -20811 0
 20807  20808 -20809  1029 -20812 0

c  0-1 --> -1
c    (-b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧ -p_1029) -> ( b^{147, 8}_2 ∧ -b^{147, 8}_1 ∧  b^{147, 8}_0)
c  in CNF:
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨  b^{147, 8}_2
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_1
c     b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨  b^{147, 8}_0
c  in DIMACS:
 20807  20808  20809  1029  20810 0
 20807  20808  20809  1029 -20811 0
 20807  20808  20809  1029  20812 0

c  -1-1 --> -2
c    ( b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧  b^{147, 7}_0 ∧ -p_1029) -> ( b^{147, 8}_2 ∧  b^{147, 8}_1 ∧ -b^{147, 8}_0)
c  in CNF:
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨  b^{147, 8}_2
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨  b^{147, 8}_1
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨  p_1029 ∨ -b^{147, 8}_0
c  in DIMACS:
-20807  20808 -20809  1029  20810 0
-20807  20808 -20809  1029  20811 0
-20807  20808 -20809  1029 -20812 0

c  -2-1 --> break 
c    ( b^{147, 7}_2 ∧  b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨  b^{147, 7}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-20807 -20808  20809  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{147, 7}_2 ∧ -b^{147, 7}_1 ∧ -b^{147, 7}_0 ∧ true) 
c  in CNF:
c    -b^{147, 7}_2 ∨  b^{147, 7}_1 ∨  b^{147, 7}_0 ∨ false 
c  in DIMACS:
-20807  20808  20809  0

c  3 does not represent an automaton state.
c    -(-b^{147, 7}_2 ∧  b^{147, 7}_1 ∧  b^{147, 7}_0 ∧ true) 
c  in CNF:
c     b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ false 
c  in DIMACS:
 20807 -20808 -20809  0
c  -3 does not represent an automaton state.
c    -( b^{147, 7}_2 ∧  b^{147, 7}_1 ∧  b^{147, 7}_0 ∧ true) 
c  in CNF:
c    -b^{147, 7}_2 ∨ -b^{147, 7}_1 ∨ -b^{147, 7}_0 ∨ false 
c  in DIMACS:
-20807 -20808 -20809  0

c INIT for k = 148
c    -b^{148, 1}_2
c    -b^{148, 1}_1
c    -b^{148, 1}_0
c  in DIMACS:
-20813 0
-20814 0
-20815 0

c Transitions for k = 148
c i = 1
c  -2+1 --> -1
c    ( b^{148, 1}_2 ∧  b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧  p_148) -> ( b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0)
c  in CNF:
c    -b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨  b^{148, 2}_2
c    -b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_1
c    -b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨  b^{148, 2}_0
c  in DIMACS:
-20813 -20814  20815 -148  20816 0
-20813 -20814  20815 -148 -20817 0
-20813 -20814  20815 -148  20818 0

c  -1+1 --> 0
c    ( b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧  b^{148, 1}_0 ∧  p_148) -> (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧ -b^{148, 2}_0)
c  in CNF:
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_2
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_1
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_0
c  in DIMACS:
-20813  20814 -20815 -148 -20816 0
-20813  20814 -20815 -148 -20817 0
-20813  20814 -20815 -148 -20818 0

c  0+1 --> 1
c    (-b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧  p_148) -> (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0)
c  in CNF:
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_2
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_1
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨  b^{148, 2}_0
c  in DIMACS:
 20813  20814  20815 -148 -20816 0
 20813  20814  20815 -148 -20817 0
 20813  20814  20815 -148  20818 0

c  1+1 --> 2
c    (-b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧  b^{148, 1}_0 ∧  p_148) -> (-b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0)
c  in CNF:
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_2
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨  b^{148, 2}_1
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ -p_148 ∨ -b^{148, 2}_0
c  in DIMACS:
 20813  20814 -20815 -148 -20816 0
 20813  20814 -20815 -148  20817 0
 20813  20814 -20815 -148 -20818 0

c  2+1 --> break 
c    (-b^{148, 1}_2 ∧  b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧  p_148) -> break
c  in CNF:
c     b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ -p_148 ∨ break
c  in DIMACS:
 20813 -20814  20815 -148 1162 0


c  2-1 --> 1
c    (-b^{148, 1}_2 ∧  b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧ -p_148) -> (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0)
c  in CNF:
c     b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_2
c     b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_1
c     b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨  b^{148, 2}_0
c  in DIMACS:
 20813 -20814  20815  148 -20816 0
 20813 -20814  20815  148 -20817 0
 20813 -20814  20815  148  20818 0

c  1-1 --> 0
c    (-b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧  b^{148, 1}_0 ∧ -p_148) -> (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧ -b^{148, 2}_0)
c  in CNF:
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_2
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_1
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_0
c  in DIMACS:
 20813  20814 -20815  148 -20816 0
 20813  20814 -20815  148 -20817 0
 20813  20814 -20815  148 -20818 0

c  0-1 --> -1
c    (-b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧ -p_148) -> ( b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0)
c  in CNF:
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨  b^{148, 2}_2
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_1
c     b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨  b^{148, 2}_0
c  in DIMACS:
 20813  20814  20815  148  20816 0
 20813  20814  20815  148 -20817 0
 20813  20814  20815  148  20818 0

c  -1-1 --> -2
c    ( b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧  b^{148, 1}_0 ∧ -p_148) -> ( b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0)
c  in CNF:
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨  b^{148, 2}_2
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨  b^{148, 2}_1
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨  p_148 ∨ -b^{148, 2}_0
c  in DIMACS:
-20813  20814 -20815  148  20816 0
-20813  20814 -20815  148  20817 0
-20813  20814 -20815  148 -20818 0

c  -2-1 --> break 
c    ( b^{148, 1}_2 ∧  b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧ -p_148) -> break
c  in CNF:
c    -b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨  b^{148, 1}_0 ∨  p_148 ∨ break
c  in DIMACS:
-20813 -20814  20815  148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 1}_2 ∧ -b^{148, 1}_1 ∧ -b^{148, 1}_0 ∧ true) 
c  in CNF:
c    -b^{148, 1}_2 ∨  b^{148, 1}_1 ∨  b^{148, 1}_0 ∨ false 
c  in DIMACS:
-20813  20814  20815  0

c  3 does not represent an automaton state.
c    -(-b^{148, 1}_2 ∧  b^{148, 1}_1 ∧  b^{148, 1}_0 ∧ true) 
c  in CNF:
c     b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ false 
c  in DIMACS:
 20813 -20814 -20815  0
c  -3 does not represent an automaton state.
c    -( b^{148, 1}_2 ∧  b^{148, 1}_1 ∧  b^{148, 1}_0 ∧ true) 
c  in CNF:
c    -b^{148, 1}_2 ∨ -b^{148, 1}_1 ∨ -b^{148, 1}_0 ∨ false 
c  in DIMACS:
-20813 -20814 -20815  0

c i = 2
c  -2+1 --> -1
c    ( b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧  p_296) -> ( b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0)
c  in CNF:
c    -b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨  b^{148, 3}_2
c    -b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_1
c    -b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨  b^{148, 3}_0
c  in DIMACS:
-20816 -20817  20818 -296  20819 0
-20816 -20817  20818 -296 -20820 0
-20816 -20817  20818 -296  20821 0

c  -1+1 --> 0
c    ( b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0 ∧  p_296) -> (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧ -b^{148, 3}_0)
c  in CNF:
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_2
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_1
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_0
c  in DIMACS:
-20816  20817 -20818 -296 -20819 0
-20816  20817 -20818 -296 -20820 0
-20816  20817 -20818 -296 -20821 0

c  0+1 --> 1
c    (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧  p_296) -> (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0)
c  in CNF:
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_2
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_1
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨  b^{148, 3}_0
c  in DIMACS:
 20816  20817  20818 -296 -20819 0
 20816  20817  20818 -296 -20820 0
 20816  20817  20818 -296  20821 0

c  1+1 --> 2
c    (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0 ∧  p_296) -> (-b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0)
c  in CNF:
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_2
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨  b^{148, 3}_1
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ -p_296 ∨ -b^{148, 3}_0
c  in DIMACS:
 20816  20817 -20818 -296 -20819 0
 20816  20817 -20818 -296  20820 0
 20816  20817 -20818 -296 -20821 0

c  2+1 --> break 
c    (-b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧  p_296) -> break
c  in CNF:
c     b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 20816 -20817  20818 -296 1162 0


c  2-1 --> 1
c    (-b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧ -p_296) -> (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0)
c  in CNF:
c     b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_2
c     b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_1
c     b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨  b^{148, 3}_0
c  in DIMACS:
 20816 -20817  20818  296 -20819 0
 20816 -20817  20818  296 -20820 0
 20816 -20817  20818  296  20821 0

c  1-1 --> 0
c    (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0 ∧ -p_296) -> (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧ -b^{148, 3}_0)
c  in CNF:
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_2
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_1
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_0
c  in DIMACS:
 20816  20817 -20818  296 -20819 0
 20816  20817 -20818  296 -20820 0
 20816  20817 -20818  296 -20821 0

c  0-1 --> -1
c    (-b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧ -p_296) -> ( b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0)
c  in CNF:
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨  b^{148, 3}_2
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_1
c     b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨  b^{148, 3}_0
c  in DIMACS:
 20816  20817  20818  296  20819 0
 20816  20817  20818  296 -20820 0
 20816  20817  20818  296  20821 0

c  -1-1 --> -2
c    ( b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧  b^{148, 2}_0 ∧ -p_296) -> ( b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0)
c  in CNF:
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨  b^{148, 3}_2
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨  b^{148, 3}_1
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨  p_296 ∨ -b^{148, 3}_0
c  in DIMACS:
-20816  20817 -20818  296  20819 0
-20816  20817 -20818  296  20820 0
-20816  20817 -20818  296 -20821 0

c  -2-1 --> break 
c    ( b^{148, 2}_2 ∧  b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨  b^{148, 2}_0 ∨  p_296 ∨ break
c  in DIMACS:
-20816 -20817  20818  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 2}_2 ∧ -b^{148, 2}_1 ∧ -b^{148, 2}_0 ∧ true) 
c  in CNF:
c    -b^{148, 2}_2 ∨  b^{148, 2}_1 ∨  b^{148, 2}_0 ∨ false 
c  in DIMACS:
-20816  20817  20818  0

c  3 does not represent an automaton state.
c    -(-b^{148, 2}_2 ∧  b^{148, 2}_1 ∧  b^{148, 2}_0 ∧ true) 
c  in CNF:
c     b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ false 
c  in DIMACS:
 20816 -20817 -20818  0
c  -3 does not represent an automaton state.
c    -( b^{148, 2}_2 ∧  b^{148, 2}_1 ∧  b^{148, 2}_0 ∧ true) 
c  in CNF:
c    -b^{148, 2}_2 ∨ -b^{148, 2}_1 ∨ -b^{148, 2}_0 ∨ false 
c  in DIMACS:
-20816 -20817 -20818  0

c i = 3
c  -2+1 --> -1
c    ( b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧  p_444) -> ( b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0)
c  in CNF:
c    -b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨  b^{148, 4}_2
c    -b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_1
c    -b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨  b^{148, 4}_0
c  in DIMACS:
-20819 -20820  20821 -444  20822 0
-20819 -20820  20821 -444 -20823 0
-20819 -20820  20821 -444  20824 0

c  -1+1 --> 0
c    ( b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0 ∧  p_444) -> (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧ -b^{148, 4}_0)
c  in CNF:
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_2
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_1
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_0
c  in DIMACS:
-20819  20820 -20821 -444 -20822 0
-20819  20820 -20821 -444 -20823 0
-20819  20820 -20821 -444 -20824 0

c  0+1 --> 1
c    (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧  p_444) -> (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0)
c  in CNF:
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_2
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_1
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨  b^{148, 4}_0
c  in DIMACS:
 20819  20820  20821 -444 -20822 0
 20819  20820  20821 -444 -20823 0
 20819  20820  20821 -444  20824 0

c  1+1 --> 2
c    (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0 ∧  p_444) -> (-b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0)
c  in CNF:
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_2
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨  b^{148, 4}_1
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ -p_444 ∨ -b^{148, 4}_0
c  in DIMACS:
 20819  20820 -20821 -444 -20822 0
 20819  20820 -20821 -444  20823 0
 20819  20820 -20821 -444 -20824 0

c  2+1 --> break 
c    (-b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧  p_444) -> break
c  in CNF:
c     b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 20819 -20820  20821 -444 1162 0


c  2-1 --> 1
c    (-b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧ -p_444) -> (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0)
c  in CNF:
c     b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_2
c     b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_1
c     b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨  b^{148, 4}_0
c  in DIMACS:
 20819 -20820  20821  444 -20822 0
 20819 -20820  20821  444 -20823 0
 20819 -20820  20821  444  20824 0

c  1-1 --> 0
c    (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0 ∧ -p_444) -> (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧ -b^{148, 4}_0)
c  in CNF:
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_2
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_1
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_0
c  in DIMACS:
 20819  20820 -20821  444 -20822 0
 20819  20820 -20821  444 -20823 0
 20819  20820 -20821  444 -20824 0

c  0-1 --> -1
c    (-b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧ -p_444) -> ( b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0)
c  in CNF:
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨  b^{148, 4}_2
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_1
c     b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨  b^{148, 4}_0
c  in DIMACS:
 20819  20820  20821  444  20822 0
 20819  20820  20821  444 -20823 0
 20819  20820  20821  444  20824 0

c  -1-1 --> -2
c    ( b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧  b^{148, 3}_0 ∧ -p_444) -> ( b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0)
c  in CNF:
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨  b^{148, 4}_2
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨  b^{148, 4}_1
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨  p_444 ∨ -b^{148, 4}_0
c  in DIMACS:
-20819  20820 -20821  444  20822 0
-20819  20820 -20821  444  20823 0
-20819  20820 -20821  444 -20824 0

c  -2-1 --> break 
c    ( b^{148, 3}_2 ∧  b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨  b^{148, 3}_0 ∨  p_444 ∨ break
c  in DIMACS:
-20819 -20820  20821  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 3}_2 ∧ -b^{148, 3}_1 ∧ -b^{148, 3}_0 ∧ true) 
c  in CNF:
c    -b^{148, 3}_2 ∨  b^{148, 3}_1 ∨  b^{148, 3}_0 ∨ false 
c  in DIMACS:
-20819  20820  20821  0

c  3 does not represent an automaton state.
c    -(-b^{148, 3}_2 ∧  b^{148, 3}_1 ∧  b^{148, 3}_0 ∧ true) 
c  in CNF:
c     b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ false 
c  in DIMACS:
 20819 -20820 -20821  0
c  -3 does not represent an automaton state.
c    -( b^{148, 3}_2 ∧  b^{148, 3}_1 ∧  b^{148, 3}_0 ∧ true) 
c  in CNF:
c    -b^{148, 3}_2 ∨ -b^{148, 3}_1 ∨ -b^{148, 3}_0 ∨ false 
c  in DIMACS:
-20819 -20820 -20821  0

c i = 4
c  -2+1 --> -1
c    ( b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧  p_592) -> ( b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0)
c  in CNF:
c    -b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨  b^{148, 5}_2
c    -b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_1
c    -b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨  b^{148, 5}_0
c  in DIMACS:
-20822 -20823  20824 -592  20825 0
-20822 -20823  20824 -592 -20826 0
-20822 -20823  20824 -592  20827 0

c  -1+1 --> 0
c    ( b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0 ∧  p_592) -> (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧ -b^{148, 5}_0)
c  in CNF:
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_2
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_1
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_0
c  in DIMACS:
-20822  20823 -20824 -592 -20825 0
-20822  20823 -20824 -592 -20826 0
-20822  20823 -20824 -592 -20827 0

c  0+1 --> 1
c    (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧  p_592) -> (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0)
c  in CNF:
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_2
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_1
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨  b^{148, 5}_0
c  in DIMACS:
 20822  20823  20824 -592 -20825 0
 20822  20823  20824 -592 -20826 0
 20822  20823  20824 -592  20827 0

c  1+1 --> 2
c    (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0 ∧  p_592) -> (-b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0)
c  in CNF:
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_2
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨  b^{148, 5}_1
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ -p_592 ∨ -b^{148, 5}_0
c  in DIMACS:
 20822  20823 -20824 -592 -20825 0
 20822  20823 -20824 -592  20826 0
 20822  20823 -20824 -592 -20827 0

c  2+1 --> break 
c    (-b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧  p_592) -> break
c  in CNF:
c     b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 20822 -20823  20824 -592 1162 0


c  2-1 --> 1
c    (-b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧ -p_592) -> (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0)
c  in CNF:
c     b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_2
c     b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_1
c     b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨  b^{148, 5}_0
c  in DIMACS:
 20822 -20823  20824  592 -20825 0
 20822 -20823  20824  592 -20826 0
 20822 -20823  20824  592  20827 0

c  1-1 --> 0
c    (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0 ∧ -p_592) -> (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧ -b^{148, 5}_0)
c  in CNF:
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_2
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_1
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_0
c  in DIMACS:
 20822  20823 -20824  592 -20825 0
 20822  20823 -20824  592 -20826 0
 20822  20823 -20824  592 -20827 0

c  0-1 --> -1
c    (-b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧ -p_592) -> ( b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0)
c  in CNF:
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨  b^{148, 5}_2
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_1
c     b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨  b^{148, 5}_0
c  in DIMACS:
 20822  20823  20824  592  20825 0
 20822  20823  20824  592 -20826 0
 20822  20823  20824  592  20827 0

c  -1-1 --> -2
c    ( b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧  b^{148, 4}_0 ∧ -p_592) -> ( b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0)
c  in CNF:
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨  b^{148, 5}_2
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨  b^{148, 5}_1
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨  p_592 ∨ -b^{148, 5}_0
c  in DIMACS:
-20822  20823 -20824  592  20825 0
-20822  20823 -20824  592  20826 0
-20822  20823 -20824  592 -20827 0

c  -2-1 --> break 
c    ( b^{148, 4}_2 ∧  b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨  b^{148, 4}_0 ∨  p_592 ∨ break
c  in DIMACS:
-20822 -20823  20824  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 4}_2 ∧ -b^{148, 4}_1 ∧ -b^{148, 4}_0 ∧ true) 
c  in CNF:
c    -b^{148, 4}_2 ∨  b^{148, 4}_1 ∨  b^{148, 4}_0 ∨ false 
c  in DIMACS:
-20822  20823  20824  0

c  3 does not represent an automaton state.
c    -(-b^{148, 4}_2 ∧  b^{148, 4}_1 ∧  b^{148, 4}_0 ∧ true) 
c  in CNF:
c     b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ false 
c  in DIMACS:
 20822 -20823 -20824  0
c  -3 does not represent an automaton state.
c    -( b^{148, 4}_2 ∧  b^{148, 4}_1 ∧  b^{148, 4}_0 ∧ true) 
c  in CNF:
c    -b^{148, 4}_2 ∨ -b^{148, 4}_1 ∨ -b^{148, 4}_0 ∨ false 
c  in DIMACS:
-20822 -20823 -20824  0

c i = 5
c  -2+1 --> -1
c    ( b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧  p_740) -> ( b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0)
c  in CNF:
c    -b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨  b^{148, 6}_2
c    -b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_1
c    -b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨  b^{148, 6}_0
c  in DIMACS:
-20825 -20826  20827 -740  20828 0
-20825 -20826  20827 -740 -20829 0
-20825 -20826  20827 -740  20830 0

c  -1+1 --> 0
c    ( b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0 ∧  p_740) -> (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧ -b^{148, 6}_0)
c  in CNF:
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_2
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_1
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_0
c  in DIMACS:
-20825  20826 -20827 -740 -20828 0
-20825  20826 -20827 -740 -20829 0
-20825  20826 -20827 -740 -20830 0

c  0+1 --> 1
c    (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧  p_740) -> (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0)
c  in CNF:
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_2
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_1
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨  b^{148, 6}_0
c  in DIMACS:
 20825  20826  20827 -740 -20828 0
 20825  20826  20827 -740 -20829 0
 20825  20826  20827 -740  20830 0

c  1+1 --> 2
c    (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0 ∧  p_740) -> (-b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0)
c  in CNF:
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_2
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨  b^{148, 6}_1
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ -p_740 ∨ -b^{148, 6}_0
c  in DIMACS:
 20825  20826 -20827 -740 -20828 0
 20825  20826 -20827 -740  20829 0
 20825  20826 -20827 -740 -20830 0

c  2+1 --> break 
c    (-b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧  p_740) -> break
c  in CNF:
c     b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 20825 -20826  20827 -740 1162 0


c  2-1 --> 1
c    (-b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧ -p_740) -> (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0)
c  in CNF:
c     b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_2
c     b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_1
c     b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨  b^{148, 6}_0
c  in DIMACS:
 20825 -20826  20827  740 -20828 0
 20825 -20826  20827  740 -20829 0
 20825 -20826  20827  740  20830 0

c  1-1 --> 0
c    (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0 ∧ -p_740) -> (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧ -b^{148, 6}_0)
c  in CNF:
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_2
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_1
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_0
c  in DIMACS:
 20825  20826 -20827  740 -20828 0
 20825  20826 -20827  740 -20829 0
 20825  20826 -20827  740 -20830 0

c  0-1 --> -1
c    (-b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧ -p_740) -> ( b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0)
c  in CNF:
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨  b^{148, 6}_2
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_1
c     b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨  b^{148, 6}_0
c  in DIMACS:
 20825  20826  20827  740  20828 0
 20825  20826  20827  740 -20829 0
 20825  20826  20827  740  20830 0

c  -1-1 --> -2
c    ( b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧  b^{148, 5}_0 ∧ -p_740) -> ( b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0)
c  in CNF:
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨  b^{148, 6}_2
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨  b^{148, 6}_1
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨  p_740 ∨ -b^{148, 6}_0
c  in DIMACS:
-20825  20826 -20827  740  20828 0
-20825  20826 -20827  740  20829 0
-20825  20826 -20827  740 -20830 0

c  -2-1 --> break 
c    ( b^{148, 5}_2 ∧  b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨  b^{148, 5}_0 ∨  p_740 ∨ break
c  in DIMACS:
-20825 -20826  20827  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 5}_2 ∧ -b^{148, 5}_1 ∧ -b^{148, 5}_0 ∧ true) 
c  in CNF:
c    -b^{148, 5}_2 ∨  b^{148, 5}_1 ∨  b^{148, 5}_0 ∨ false 
c  in DIMACS:
-20825  20826  20827  0

c  3 does not represent an automaton state.
c    -(-b^{148, 5}_2 ∧  b^{148, 5}_1 ∧  b^{148, 5}_0 ∧ true) 
c  in CNF:
c     b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ false 
c  in DIMACS:
 20825 -20826 -20827  0
c  -3 does not represent an automaton state.
c    -( b^{148, 5}_2 ∧  b^{148, 5}_1 ∧  b^{148, 5}_0 ∧ true) 
c  in CNF:
c    -b^{148, 5}_2 ∨ -b^{148, 5}_1 ∨ -b^{148, 5}_0 ∨ false 
c  in DIMACS:
-20825 -20826 -20827  0

c i = 6
c  -2+1 --> -1
c    ( b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧  p_888) -> ( b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0)
c  in CNF:
c    -b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨  b^{148, 7}_2
c    -b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_1
c    -b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨  b^{148, 7}_0
c  in DIMACS:
-20828 -20829  20830 -888  20831 0
-20828 -20829  20830 -888 -20832 0
-20828 -20829  20830 -888  20833 0

c  -1+1 --> 0
c    ( b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0 ∧  p_888) -> (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧ -b^{148, 7}_0)
c  in CNF:
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_2
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_1
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_0
c  in DIMACS:
-20828  20829 -20830 -888 -20831 0
-20828  20829 -20830 -888 -20832 0
-20828  20829 -20830 -888 -20833 0

c  0+1 --> 1
c    (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧  p_888) -> (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0)
c  in CNF:
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_2
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_1
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨  b^{148, 7}_0
c  in DIMACS:
 20828  20829  20830 -888 -20831 0
 20828  20829  20830 -888 -20832 0
 20828  20829  20830 -888  20833 0

c  1+1 --> 2
c    (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0 ∧  p_888) -> (-b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0)
c  in CNF:
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_2
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨  b^{148, 7}_1
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ -p_888 ∨ -b^{148, 7}_0
c  in DIMACS:
 20828  20829 -20830 -888 -20831 0
 20828  20829 -20830 -888  20832 0
 20828  20829 -20830 -888 -20833 0

c  2+1 --> break 
c    (-b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧  p_888) -> break
c  in CNF:
c     b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 20828 -20829  20830 -888 1162 0


c  2-1 --> 1
c    (-b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧ -p_888) -> (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0)
c  in CNF:
c     b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_2
c     b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_1
c     b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨  b^{148, 7}_0
c  in DIMACS:
 20828 -20829  20830  888 -20831 0
 20828 -20829  20830  888 -20832 0
 20828 -20829  20830  888  20833 0

c  1-1 --> 0
c    (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0 ∧ -p_888) -> (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧ -b^{148, 7}_0)
c  in CNF:
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_2
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_1
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_0
c  in DIMACS:
 20828  20829 -20830  888 -20831 0
 20828  20829 -20830  888 -20832 0
 20828  20829 -20830  888 -20833 0

c  0-1 --> -1
c    (-b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧ -p_888) -> ( b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0)
c  in CNF:
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨  b^{148, 7}_2
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_1
c     b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨  b^{148, 7}_0
c  in DIMACS:
 20828  20829  20830  888  20831 0
 20828  20829  20830  888 -20832 0
 20828  20829  20830  888  20833 0

c  -1-1 --> -2
c    ( b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧  b^{148, 6}_0 ∧ -p_888) -> ( b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0)
c  in CNF:
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨  b^{148, 7}_2
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨  b^{148, 7}_1
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨  p_888 ∨ -b^{148, 7}_0
c  in DIMACS:
-20828  20829 -20830  888  20831 0
-20828  20829 -20830  888  20832 0
-20828  20829 -20830  888 -20833 0

c  -2-1 --> break 
c    ( b^{148, 6}_2 ∧  b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨  b^{148, 6}_0 ∨  p_888 ∨ break
c  in DIMACS:
-20828 -20829  20830  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 6}_2 ∧ -b^{148, 6}_1 ∧ -b^{148, 6}_0 ∧ true) 
c  in CNF:
c    -b^{148, 6}_2 ∨  b^{148, 6}_1 ∨  b^{148, 6}_0 ∨ false 
c  in DIMACS:
-20828  20829  20830  0

c  3 does not represent an automaton state.
c    -(-b^{148, 6}_2 ∧  b^{148, 6}_1 ∧  b^{148, 6}_0 ∧ true) 
c  in CNF:
c     b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ false 
c  in DIMACS:
 20828 -20829 -20830  0
c  -3 does not represent an automaton state.
c    -( b^{148, 6}_2 ∧  b^{148, 6}_1 ∧  b^{148, 6}_0 ∧ true) 
c  in CNF:
c    -b^{148, 6}_2 ∨ -b^{148, 6}_1 ∨ -b^{148, 6}_0 ∨ false 
c  in DIMACS:
-20828 -20829 -20830  0

c i = 7
c  -2+1 --> -1
c    ( b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧  p_1036) -> ( b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧  b^{148, 8}_0)
c  in CNF:
c    -b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨  b^{148, 8}_2
c    -b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_1
c    -b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨  b^{148, 8}_0
c  in DIMACS:
-20831 -20832  20833 -1036  20834 0
-20831 -20832  20833 -1036 -20835 0
-20831 -20832  20833 -1036  20836 0

c  -1+1 --> 0
c    ( b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0 ∧  p_1036) -> (-b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧ -b^{148, 8}_0)
c  in CNF:
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_2
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_1
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_0
c  in DIMACS:
-20831  20832 -20833 -1036 -20834 0
-20831  20832 -20833 -1036 -20835 0
-20831  20832 -20833 -1036 -20836 0

c  0+1 --> 1
c    (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧  p_1036) -> (-b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧  b^{148, 8}_0)
c  in CNF:
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_2
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_1
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨  b^{148, 8}_0
c  in DIMACS:
 20831  20832  20833 -1036 -20834 0
 20831  20832  20833 -1036 -20835 0
 20831  20832  20833 -1036  20836 0

c  1+1 --> 2
c    (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0 ∧  p_1036) -> (-b^{148, 8}_2 ∧  b^{148, 8}_1 ∧ -b^{148, 8}_0)
c  in CNF:
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_2
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨  b^{148, 8}_1
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ -p_1036 ∨ -b^{148, 8}_0
c  in DIMACS:
 20831  20832 -20833 -1036 -20834 0
 20831  20832 -20833 -1036  20835 0
 20831  20832 -20833 -1036 -20836 0

c  2+1 --> break 
c    (-b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 20831 -20832  20833 -1036 1162 0


c  2-1 --> 1
c    (-b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧ -p_1036) -> (-b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧  b^{148, 8}_0)
c  in CNF:
c     b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_2
c     b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_1
c     b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨  b^{148, 8}_0
c  in DIMACS:
 20831 -20832  20833  1036 -20834 0
 20831 -20832  20833  1036 -20835 0
 20831 -20832  20833  1036  20836 0

c  1-1 --> 0
c    (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0 ∧ -p_1036) -> (-b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧ -b^{148, 8}_0)
c  in CNF:
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_2
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_1
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_0
c  in DIMACS:
 20831  20832 -20833  1036 -20834 0
 20831  20832 -20833  1036 -20835 0
 20831  20832 -20833  1036 -20836 0

c  0-1 --> -1
c    (-b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧ -p_1036) -> ( b^{148, 8}_2 ∧ -b^{148, 8}_1 ∧  b^{148, 8}_0)
c  in CNF:
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨  b^{148, 8}_2
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_1
c     b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨  b^{148, 8}_0
c  in DIMACS:
 20831  20832  20833  1036  20834 0
 20831  20832  20833  1036 -20835 0
 20831  20832  20833  1036  20836 0

c  -1-1 --> -2
c    ( b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧  b^{148, 7}_0 ∧ -p_1036) -> ( b^{148, 8}_2 ∧  b^{148, 8}_1 ∧ -b^{148, 8}_0)
c  in CNF:
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨  b^{148, 8}_2
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨  b^{148, 8}_1
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨  p_1036 ∨ -b^{148, 8}_0
c  in DIMACS:
-20831  20832 -20833  1036  20834 0
-20831  20832 -20833  1036  20835 0
-20831  20832 -20833  1036 -20836 0

c  -2-1 --> break 
c    ( b^{148, 7}_2 ∧  b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨  b^{148, 7}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-20831 -20832  20833  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{148, 7}_2 ∧ -b^{148, 7}_1 ∧ -b^{148, 7}_0 ∧ true) 
c  in CNF:
c    -b^{148, 7}_2 ∨  b^{148, 7}_1 ∨  b^{148, 7}_0 ∨ false 
c  in DIMACS:
-20831  20832  20833  0

c  3 does not represent an automaton state.
c    -(-b^{148, 7}_2 ∧  b^{148, 7}_1 ∧  b^{148, 7}_0 ∧ true) 
c  in CNF:
c     b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ false 
c  in DIMACS:
 20831 -20832 -20833  0
c  -3 does not represent an automaton state.
c    -( b^{148, 7}_2 ∧  b^{148, 7}_1 ∧  b^{148, 7}_0 ∧ true) 
c  in CNF:
c    -b^{148, 7}_2 ∨ -b^{148, 7}_1 ∨ -b^{148, 7}_0 ∨ false 
c  in DIMACS:
-20831 -20832 -20833  0

c INIT for k = 149
c    -b^{149, 1}_2
c    -b^{149, 1}_1
c    -b^{149, 1}_0
c  in DIMACS:
-20837 0
-20838 0
-20839 0

c Transitions for k = 149
c i = 1
c  -2+1 --> -1
c    ( b^{149, 1}_2 ∧  b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧  p_149) -> ( b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0)
c  in CNF:
c    -b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨  b^{149, 2}_2
c    -b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_1
c    -b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨  b^{149, 2}_0
c  in DIMACS:
-20837 -20838  20839 -149  20840 0
-20837 -20838  20839 -149 -20841 0
-20837 -20838  20839 -149  20842 0

c  -1+1 --> 0
c    ( b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧  b^{149, 1}_0 ∧  p_149) -> (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧ -b^{149, 2}_0)
c  in CNF:
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_2
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_1
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_0
c  in DIMACS:
-20837  20838 -20839 -149 -20840 0
-20837  20838 -20839 -149 -20841 0
-20837  20838 -20839 -149 -20842 0

c  0+1 --> 1
c    (-b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧  p_149) -> (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0)
c  in CNF:
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_2
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_1
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨  b^{149, 2}_0
c  in DIMACS:
 20837  20838  20839 -149 -20840 0
 20837  20838  20839 -149 -20841 0
 20837  20838  20839 -149  20842 0

c  1+1 --> 2
c    (-b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧  b^{149, 1}_0 ∧  p_149) -> (-b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0)
c  in CNF:
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_2
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨  b^{149, 2}_1
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ -p_149 ∨ -b^{149, 2}_0
c  in DIMACS:
 20837  20838 -20839 -149 -20840 0
 20837  20838 -20839 -149  20841 0
 20837  20838 -20839 -149 -20842 0

c  2+1 --> break 
c    (-b^{149, 1}_2 ∧  b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧  p_149) -> break
c  in CNF:
c     b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ -p_149 ∨ break
c  in DIMACS:
 20837 -20838  20839 -149 1162 0


c  2-1 --> 1
c    (-b^{149, 1}_2 ∧  b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧ -p_149) -> (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0)
c  in CNF:
c     b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_2
c     b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_1
c     b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨  b^{149, 2}_0
c  in DIMACS:
 20837 -20838  20839  149 -20840 0
 20837 -20838  20839  149 -20841 0
 20837 -20838  20839  149  20842 0

c  1-1 --> 0
c    (-b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧  b^{149, 1}_0 ∧ -p_149) -> (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧ -b^{149, 2}_0)
c  in CNF:
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_2
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_1
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_0
c  in DIMACS:
 20837  20838 -20839  149 -20840 0
 20837  20838 -20839  149 -20841 0
 20837  20838 -20839  149 -20842 0

c  0-1 --> -1
c    (-b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧ -p_149) -> ( b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0)
c  in CNF:
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨  b^{149, 2}_2
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_1
c     b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨  b^{149, 2}_0
c  in DIMACS:
 20837  20838  20839  149  20840 0
 20837  20838  20839  149 -20841 0
 20837  20838  20839  149  20842 0

c  -1-1 --> -2
c    ( b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧  b^{149, 1}_0 ∧ -p_149) -> ( b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0)
c  in CNF:
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨  b^{149, 2}_2
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨  b^{149, 2}_1
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨  p_149 ∨ -b^{149, 2}_0
c  in DIMACS:
-20837  20838 -20839  149  20840 0
-20837  20838 -20839  149  20841 0
-20837  20838 -20839  149 -20842 0

c  -2-1 --> break 
c    ( b^{149, 1}_2 ∧  b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧ -p_149) -> break
c  in CNF:
c    -b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨  b^{149, 1}_0 ∨  p_149 ∨ break
c  in DIMACS:
-20837 -20838  20839  149 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 1}_2 ∧ -b^{149, 1}_1 ∧ -b^{149, 1}_0 ∧ true) 
c  in CNF:
c    -b^{149, 1}_2 ∨  b^{149, 1}_1 ∨  b^{149, 1}_0 ∨ false 
c  in DIMACS:
-20837  20838  20839  0

c  3 does not represent an automaton state.
c    -(-b^{149, 1}_2 ∧  b^{149, 1}_1 ∧  b^{149, 1}_0 ∧ true) 
c  in CNF:
c     b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ false 
c  in DIMACS:
 20837 -20838 -20839  0
c  -3 does not represent an automaton state.
c    -( b^{149, 1}_2 ∧  b^{149, 1}_1 ∧  b^{149, 1}_0 ∧ true) 
c  in CNF:
c    -b^{149, 1}_2 ∨ -b^{149, 1}_1 ∨ -b^{149, 1}_0 ∨ false 
c  in DIMACS:
-20837 -20838 -20839  0

c i = 2
c  -2+1 --> -1
c    ( b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧  p_298) -> ( b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0)
c  in CNF:
c    -b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨  b^{149, 3}_2
c    -b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_1
c    -b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨  b^{149, 3}_0
c  in DIMACS:
-20840 -20841  20842 -298  20843 0
-20840 -20841  20842 -298 -20844 0
-20840 -20841  20842 -298  20845 0

c  -1+1 --> 0
c    ( b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0 ∧  p_298) -> (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧ -b^{149, 3}_0)
c  in CNF:
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_2
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_1
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_0
c  in DIMACS:
-20840  20841 -20842 -298 -20843 0
-20840  20841 -20842 -298 -20844 0
-20840  20841 -20842 -298 -20845 0

c  0+1 --> 1
c    (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧  p_298) -> (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0)
c  in CNF:
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_2
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_1
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨  b^{149, 3}_0
c  in DIMACS:
 20840  20841  20842 -298 -20843 0
 20840  20841  20842 -298 -20844 0
 20840  20841  20842 -298  20845 0

c  1+1 --> 2
c    (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0 ∧  p_298) -> (-b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0)
c  in CNF:
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_2
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨  b^{149, 3}_1
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ -p_298 ∨ -b^{149, 3}_0
c  in DIMACS:
 20840  20841 -20842 -298 -20843 0
 20840  20841 -20842 -298  20844 0
 20840  20841 -20842 -298 -20845 0

c  2+1 --> break 
c    (-b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧  p_298) -> break
c  in CNF:
c     b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ -p_298 ∨ break
c  in DIMACS:
 20840 -20841  20842 -298 1162 0


c  2-1 --> 1
c    (-b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧ -p_298) -> (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0)
c  in CNF:
c     b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_2
c     b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_1
c     b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨  b^{149, 3}_0
c  in DIMACS:
 20840 -20841  20842  298 -20843 0
 20840 -20841  20842  298 -20844 0
 20840 -20841  20842  298  20845 0

c  1-1 --> 0
c    (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0 ∧ -p_298) -> (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧ -b^{149, 3}_0)
c  in CNF:
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_2
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_1
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_0
c  in DIMACS:
 20840  20841 -20842  298 -20843 0
 20840  20841 -20842  298 -20844 0
 20840  20841 -20842  298 -20845 0

c  0-1 --> -1
c    (-b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧ -p_298) -> ( b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0)
c  in CNF:
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨  b^{149, 3}_2
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_1
c     b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨  b^{149, 3}_0
c  in DIMACS:
 20840  20841  20842  298  20843 0
 20840  20841  20842  298 -20844 0
 20840  20841  20842  298  20845 0

c  -1-1 --> -2
c    ( b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧  b^{149, 2}_0 ∧ -p_298) -> ( b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0)
c  in CNF:
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨  b^{149, 3}_2
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨  b^{149, 3}_1
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨  p_298 ∨ -b^{149, 3}_0
c  in DIMACS:
-20840  20841 -20842  298  20843 0
-20840  20841 -20842  298  20844 0
-20840  20841 -20842  298 -20845 0

c  -2-1 --> break 
c    ( b^{149, 2}_2 ∧  b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧ -p_298) -> break
c  in CNF:
c    -b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨  b^{149, 2}_0 ∨  p_298 ∨ break
c  in DIMACS:
-20840 -20841  20842  298 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 2}_2 ∧ -b^{149, 2}_1 ∧ -b^{149, 2}_0 ∧ true) 
c  in CNF:
c    -b^{149, 2}_2 ∨  b^{149, 2}_1 ∨  b^{149, 2}_0 ∨ false 
c  in DIMACS:
-20840  20841  20842  0

c  3 does not represent an automaton state.
c    -(-b^{149, 2}_2 ∧  b^{149, 2}_1 ∧  b^{149, 2}_0 ∧ true) 
c  in CNF:
c     b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ false 
c  in DIMACS:
 20840 -20841 -20842  0
c  -3 does not represent an automaton state.
c    -( b^{149, 2}_2 ∧  b^{149, 2}_1 ∧  b^{149, 2}_0 ∧ true) 
c  in CNF:
c    -b^{149, 2}_2 ∨ -b^{149, 2}_1 ∨ -b^{149, 2}_0 ∨ false 
c  in DIMACS:
-20840 -20841 -20842  0

c i = 3
c  -2+1 --> -1
c    ( b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧  p_447) -> ( b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0)
c  in CNF:
c    -b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨  b^{149, 4}_2
c    -b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_1
c    -b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨  b^{149, 4}_0
c  in DIMACS:
-20843 -20844  20845 -447  20846 0
-20843 -20844  20845 -447 -20847 0
-20843 -20844  20845 -447  20848 0

c  -1+1 --> 0
c    ( b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0 ∧  p_447) -> (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧ -b^{149, 4}_0)
c  in CNF:
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_2
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_1
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_0
c  in DIMACS:
-20843  20844 -20845 -447 -20846 0
-20843  20844 -20845 -447 -20847 0
-20843  20844 -20845 -447 -20848 0

c  0+1 --> 1
c    (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧  p_447) -> (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0)
c  in CNF:
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_2
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_1
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨  b^{149, 4}_0
c  in DIMACS:
 20843  20844  20845 -447 -20846 0
 20843  20844  20845 -447 -20847 0
 20843  20844  20845 -447  20848 0

c  1+1 --> 2
c    (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0 ∧  p_447) -> (-b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0)
c  in CNF:
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_2
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨  b^{149, 4}_1
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ -p_447 ∨ -b^{149, 4}_0
c  in DIMACS:
 20843  20844 -20845 -447 -20846 0
 20843  20844 -20845 -447  20847 0
 20843  20844 -20845 -447 -20848 0

c  2+1 --> break 
c    (-b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧  p_447) -> break
c  in CNF:
c     b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ -p_447 ∨ break
c  in DIMACS:
 20843 -20844  20845 -447 1162 0


c  2-1 --> 1
c    (-b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧ -p_447) -> (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0)
c  in CNF:
c     b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_2
c     b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_1
c     b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨  b^{149, 4}_0
c  in DIMACS:
 20843 -20844  20845  447 -20846 0
 20843 -20844  20845  447 -20847 0
 20843 -20844  20845  447  20848 0

c  1-1 --> 0
c    (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0 ∧ -p_447) -> (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧ -b^{149, 4}_0)
c  in CNF:
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_2
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_1
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_0
c  in DIMACS:
 20843  20844 -20845  447 -20846 0
 20843  20844 -20845  447 -20847 0
 20843  20844 -20845  447 -20848 0

c  0-1 --> -1
c    (-b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧ -p_447) -> ( b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0)
c  in CNF:
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨  b^{149, 4}_2
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_1
c     b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨  b^{149, 4}_0
c  in DIMACS:
 20843  20844  20845  447  20846 0
 20843  20844  20845  447 -20847 0
 20843  20844  20845  447  20848 0

c  -1-1 --> -2
c    ( b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧  b^{149, 3}_0 ∧ -p_447) -> ( b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0)
c  in CNF:
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨  b^{149, 4}_2
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨  b^{149, 4}_1
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨  p_447 ∨ -b^{149, 4}_0
c  in DIMACS:
-20843  20844 -20845  447  20846 0
-20843  20844 -20845  447  20847 0
-20843  20844 -20845  447 -20848 0

c  -2-1 --> break 
c    ( b^{149, 3}_2 ∧  b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧ -p_447) -> break
c  in CNF:
c    -b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨  b^{149, 3}_0 ∨  p_447 ∨ break
c  in DIMACS:
-20843 -20844  20845  447 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 3}_2 ∧ -b^{149, 3}_1 ∧ -b^{149, 3}_0 ∧ true) 
c  in CNF:
c    -b^{149, 3}_2 ∨  b^{149, 3}_1 ∨  b^{149, 3}_0 ∨ false 
c  in DIMACS:
-20843  20844  20845  0

c  3 does not represent an automaton state.
c    -(-b^{149, 3}_2 ∧  b^{149, 3}_1 ∧  b^{149, 3}_0 ∧ true) 
c  in CNF:
c     b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ false 
c  in DIMACS:
 20843 -20844 -20845  0
c  -3 does not represent an automaton state.
c    -( b^{149, 3}_2 ∧  b^{149, 3}_1 ∧  b^{149, 3}_0 ∧ true) 
c  in CNF:
c    -b^{149, 3}_2 ∨ -b^{149, 3}_1 ∨ -b^{149, 3}_0 ∨ false 
c  in DIMACS:
-20843 -20844 -20845  0

c i = 4
c  -2+1 --> -1
c    ( b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧  p_596) -> ( b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0)
c  in CNF:
c    -b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨  b^{149, 5}_2
c    -b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_1
c    -b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨  b^{149, 5}_0
c  in DIMACS:
-20846 -20847  20848 -596  20849 0
-20846 -20847  20848 -596 -20850 0
-20846 -20847  20848 -596  20851 0

c  -1+1 --> 0
c    ( b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0 ∧  p_596) -> (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧ -b^{149, 5}_0)
c  in CNF:
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_2
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_1
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_0
c  in DIMACS:
-20846  20847 -20848 -596 -20849 0
-20846  20847 -20848 -596 -20850 0
-20846  20847 -20848 -596 -20851 0

c  0+1 --> 1
c    (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧  p_596) -> (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0)
c  in CNF:
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_2
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_1
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨  b^{149, 5}_0
c  in DIMACS:
 20846  20847  20848 -596 -20849 0
 20846  20847  20848 -596 -20850 0
 20846  20847  20848 -596  20851 0

c  1+1 --> 2
c    (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0 ∧  p_596) -> (-b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0)
c  in CNF:
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_2
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨  b^{149, 5}_1
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ -p_596 ∨ -b^{149, 5}_0
c  in DIMACS:
 20846  20847 -20848 -596 -20849 0
 20846  20847 -20848 -596  20850 0
 20846  20847 -20848 -596 -20851 0

c  2+1 --> break 
c    (-b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧  p_596) -> break
c  in CNF:
c     b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ -p_596 ∨ break
c  in DIMACS:
 20846 -20847  20848 -596 1162 0


c  2-1 --> 1
c    (-b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧ -p_596) -> (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0)
c  in CNF:
c     b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_2
c     b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_1
c     b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨  b^{149, 5}_0
c  in DIMACS:
 20846 -20847  20848  596 -20849 0
 20846 -20847  20848  596 -20850 0
 20846 -20847  20848  596  20851 0

c  1-1 --> 0
c    (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0 ∧ -p_596) -> (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧ -b^{149, 5}_0)
c  in CNF:
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_2
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_1
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_0
c  in DIMACS:
 20846  20847 -20848  596 -20849 0
 20846  20847 -20848  596 -20850 0
 20846  20847 -20848  596 -20851 0

c  0-1 --> -1
c    (-b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧ -p_596) -> ( b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0)
c  in CNF:
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨  b^{149, 5}_2
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_1
c     b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨  b^{149, 5}_0
c  in DIMACS:
 20846  20847  20848  596  20849 0
 20846  20847  20848  596 -20850 0
 20846  20847  20848  596  20851 0

c  -1-1 --> -2
c    ( b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧  b^{149, 4}_0 ∧ -p_596) -> ( b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0)
c  in CNF:
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨  b^{149, 5}_2
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨  b^{149, 5}_1
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨  p_596 ∨ -b^{149, 5}_0
c  in DIMACS:
-20846  20847 -20848  596  20849 0
-20846  20847 -20848  596  20850 0
-20846  20847 -20848  596 -20851 0

c  -2-1 --> break 
c    ( b^{149, 4}_2 ∧  b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧ -p_596) -> break
c  in CNF:
c    -b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨  b^{149, 4}_0 ∨  p_596 ∨ break
c  in DIMACS:
-20846 -20847  20848  596 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 4}_2 ∧ -b^{149, 4}_1 ∧ -b^{149, 4}_0 ∧ true) 
c  in CNF:
c    -b^{149, 4}_2 ∨  b^{149, 4}_1 ∨  b^{149, 4}_0 ∨ false 
c  in DIMACS:
-20846  20847  20848  0

c  3 does not represent an automaton state.
c    -(-b^{149, 4}_2 ∧  b^{149, 4}_1 ∧  b^{149, 4}_0 ∧ true) 
c  in CNF:
c     b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ false 
c  in DIMACS:
 20846 -20847 -20848  0
c  -3 does not represent an automaton state.
c    -( b^{149, 4}_2 ∧  b^{149, 4}_1 ∧  b^{149, 4}_0 ∧ true) 
c  in CNF:
c    -b^{149, 4}_2 ∨ -b^{149, 4}_1 ∨ -b^{149, 4}_0 ∨ false 
c  in DIMACS:
-20846 -20847 -20848  0

c i = 5
c  -2+1 --> -1
c    ( b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧  p_745) -> ( b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0)
c  in CNF:
c    -b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨  b^{149, 6}_2
c    -b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_1
c    -b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨  b^{149, 6}_0
c  in DIMACS:
-20849 -20850  20851 -745  20852 0
-20849 -20850  20851 -745 -20853 0
-20849 -20850  20851 -745  20854 0

c  -1+1 --> 0
c    ( b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0 ∧  p_745) -> (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧ -b^{149, 6}_0)
c  in CNF:
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_2
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_1
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_0
c  in DIMACS:
-20849  20850 -20851 -745 -20852 0
-20849  20850 -20851 -745 -20853 0
-20849  20850 -20851 -745 -20854 0

c  0+1 --> 1
c    (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧  p_745) -> (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0)
c  in CNF:
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_2
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_1
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨  b^{149, 6}_0
c  in DIMACS:
 20849  20850  20851 -745 -20852 0
 20849  20850  20851 -745 -20853 0
 20849  20850  20851 -745  20854 0

c  1+1 --> 2
c    (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0 ∧  p_745) -> (-b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0)
c  in CNF:
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_2
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨  b^{149, 6}_1
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ -p_745 ∨ -b^{149, 6}_0
c  in DIMACS:
 20849  20850 -20851 -745 -20852 0
 20849  20850 -20851 -745  20853 0
 20849  20850 -20851 -745 -20854 0

c  2+1 --> break 
c    (-b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧  p_745) -> break
c  in CNF:
c     b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ -p_745 ∨ break
c  in DIMACS:
 20849 -20850  20851 -745 1162 0


c  2-1 --> 1
c    (-b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧ -p_745) -> (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0)
c  in CNF:
c     b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_2
c     b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_1
c     b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨  b^{149, 6}_0
c  in DIMACS:
 20849 -20850  20851  745 -20852 0
 20849 -20850  20851  745 -20853 0
 20849 -20850  20851  745  20854 0

c  1-1 --> 0
c    (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0 ∧ -p_745) -> (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧ -b^{149, 6}_0)
c  in CNF:
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_2
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_1
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_0
c  in DIMACS:
 20849  20850 -20851  745 -20852 0
 20849  20850 -20851  745 -20853 0
 20849  20850 -20851  745 -20854 0

c  0-1 --> -1
c    (-b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧ -p_745) -> ( b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0)
c  in CNF:
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨  b^{149, 6}_2
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_1
c     b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨  b^{149, 6}_0
c  in DIMACS:
 20849  20850  20851  745  20852 0
 20849  20850  20851  745 -20853 0
 20849  20850  20851  745  20854 0

c  -1-1 --> -2
c    ( b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧  b^{149, 5}_0 ∧ -p_745) -> ( b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0)
c  in CNF:
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨  b^{149, 6}_2
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨  b^{149, 6}_1
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨  p_745 ∨ -b^{149, 6}_0
c  in DIMACS:
-20849  20850 -20851  745  20852 0
-20849  20850 -20851  745  20853 0
-20849  20850 -20851  745 -20854 0

c  -2-1 --> break 
c    ( b^{149, 5}_2 ∧  b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧ -p_745) -> break
c  in CNF:
c    -b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨  b^{149, 5}_0 ∨  p_745 ∨ break
c  in DIMACS:
-20849 -20850  20851  745 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 5}_2 ∧ -b^{149, 5}_1 ∧ -b^{149, 5}_0 ∧ true) 
c  in CNF:
c    -b^{149, 5}_2 ∨  b^{149, 5}_1 ∨  b^{149, 5}_0 ∨ false 
c  in DIMACS:
-20849  20850  20851  0

c  3 does not represent an automaton state.
c    -(-b^{149, 5}_2 ∧  b^{149, 5}_1 ∧  b^{149, 5}_0 ∧ true) 
c  in CNF:
c     b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ false 
c  in DIMACS:
 20849 -20850 -20851  0
c  -3 does not represent an automaton state.
c    -( b^{149, 5}_2 ∧  b^{149, 5}_1 ∧  b^{149, 5}_0 ∧ true) 
c  in CNF:
c    -b^{149, 5}_2 ∨ -b^{149, 5}_1 ∨ -b^{149, 5}_0 ∨ false 
c  in DIMACS:
-20849 -20850 -20851  0

c i = 6
c  -2+1 --> -1
c    ( b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧  p_894) -> ( b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0)
c  in CNF:
c    -b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨  b^{149, 7}_2
c    -b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_1
c    -b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨  b^{149, 7}_0
c  in DIMACS:
-20852 -20853  20854 -894  20855 0
-20852 -20853  20854 -894 -20856 0
-20852 -20853  20854 -894  20857 0

c  -1+1 --> 0
c    ( b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0 ∧  p_894) -> (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧ -b^{149, 7}_0)
c  in CNF:
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_2
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_1
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_0
c  in DIMACS:
-20852  20853 -20854 -894 -20855 0
-20852  20853 -20854 -894 -20856 0
-20852  20853 -20854 -894 -20857 0

c  0+1 --> 1
c    (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧  p_894) -> (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0)
c  in CNF:
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_2
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_1
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨  b^{149, 7}_0
c  in DIMACS:
 20852  20853  20854 -894 -20855 0
 20852  20853  20854 -894 -20856 0
 20852  20853  20854 -894  20857 0

c  1+1 --> 2
c    (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0 ∧  p_894) -> (-b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0)
c  in CNF:
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_2
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨  b^{149, 7}_1
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ -p_894 ∨ -b^{149, 7}_0
c  in DIMACS:
 20852  20853 -20854 -894 -20855 0
 20852  20853 -20854 -894  20856 0
 20852  20853 -20854 -894 -20857 0

c  2+1 --> break 
c    (-b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧  p_894) -> break
c  in CNF:
c     b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 20852 -20853  20854 -894 1162 0


c  2-1 --> 1
c    (-b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧ -p_894) -> (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0)
c  in CNF:
c     b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_2
c     b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_1
c     b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨  b^{149, 7}_0
c  in DIMACS:
 20852 -20853  20854  894 -20855 0
 20852 -20853  20854  894 -20856 0
 20852 -20853  20854  894  20857 0

c  1-1 --> 0
c    (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0 ∧ -p_894) -> (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧ -b^{149, 7}_0)
c  in CNF:
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_2
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_1
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_0
c  in DIMACS:
 20852  20853 -20854  894 -20855 0
 20852  20853 -20854  894 -20856 0
 20852  20853 -20854  894 -20857 0

c  0-1 --> -1
c    (-b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧ -p_894) -> ( b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0)
c  in CNF:
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨  b^{149, 7}_2
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_1
c     b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨  b^{149, 7}_0
c  in DIMACS:
 20852  20853  20854  894  20855 0
 20852  20853  20854  894 -20856 0
 20852  20853  20854  894  20857 0

c  -1-1 --> -2
c    ( b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧  b^{149, 6}_0 ∧ -p_894) -> ( b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0)
c  in CNF:
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨  b^{149, 7}_2
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨  b^{149, 7}_1
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨  p_894 ∨ -b^{149, 7}_0
c  in DIMACS:
-20852  20853 -20854  894  20855 0
-20852  20853 -20854  894  20856 0
-20852  20853 -20854  894 -20857 0

c  -2-1 --> break 
c    ( b^{149, 6}_2 ∧  b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨  b^{149, 6}_0 ∨  p_894 ∨ break
c  in DIMACS:
-20852 -20853  20854  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 6}_2 ∧ -b^{149, 6}_1 ∧ -b^{149, 6}_0 ∧ true) 
c  in CNF:
c    -b^{149, 6}_2 ∨  b^{149, 6}_1 ∨  b^{149, 6}_0 ∨ false 
c  in DIMACS:
-20852  20853  20854  0

c  3 does not represent an automaton state.
c    -(-b^{149, 6}_2 ∧  b^{149, 6}_1 ∧  b^{149, 6}_0 ∧ true) 
c  in CNF:
c     b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ false 
c  in DIMACS:
 20852 -20853 -20854  0
c  -3 does not represent an automaton state.
c    -( b^{149, 6}_2 ∧  b^{149, 6}_1 ∧  b^{149, 6}_0 ∧ true) 
c  in CNF:
c    -b^{149, 6}_2 ∨ -b^{149, 6}_1 ∨ -b^{149, 6}_0 ∨ false 
c  in DIMACS:
-20852 -20853 -20854  0

c i = 7
c  -2+1 --> -1
c    ( b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧  p_1043) -> ( b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧  b^{149, 8}_0)
c  in CNF:
c    -b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨  b^{149, 8}_2
c    -b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_1
c    -b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨  b^{149, 8}_0
c  in DIMACS:
-20855 -20856  20857 -1043  20858 0
-20855 -20856  20857 -1043 -20859 0
-20855 -20856  20857 -1043  20860 0

c  -1+1 --> 0
c    ( b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0 ∧  p_1043) -> (-b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧ -b^{149, 8}_0)
c  in CNF:
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_2
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_1
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_0
c  in DIMACS:
-20855  20856 -20857 -1043 -20858 0
-20855  20856 -20857 -1043 -20859 0
-20855  20856 -20857 -1043 -20860 0

c  0+1 --> 1
c    (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧  p_1043) -> (-b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧  b^{149, 8}_0)
c  in CNF:
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_2
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_1
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨  b^{149, 8}_0
c  in DIMACS:
 20855  20856  20857 -1043 -20858 0
 20855  20856  20857 -1043 -20859 0
 20855  20856  20857 -1043  20860 0

c  1+1 --> 2
c    (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0 ∧  p_1043) -> (-b^{149, 8}_2 ∧  b^{149, 8}_1 ∧ -b^{149, 8}_0)
c  in CNF:
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_2
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨  b^{149, 8}_1
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ -p_1043 ∨ -b^{149, 8}_0
c  in DIMACS:
 20855  20856 -20857 -1043 -20858 0
 20855  20856 -20857 -1043  20859 0
 20855  20856 -20857 -1043 -20860 0

c  2+1 --> break 
c    (-b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧  p_1043) -> break
c  in CNF:
c     b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ -p_1043 ∨ break
c  in DIMACS:
 20855 -20856  20857 -1043 1162 0


c  2-1 --> 1
c    (-b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧ -p_1043) -> (-b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧  b^{149, 8}_0)
c  in CNF:
c     b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_2
c     b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_1
c     b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨  b^{149, 8}_0
c  in DIMACS:
 20855 -20856  20857  1043 -20858 0
 20855 -20856  20857  1043 -20859 0
 20855 -20856  20857  1043  20860 0

c  1-1 --> 0
c    (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0 ∧ -p_1043) -> (-b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧ -b^{149, 8}_0)
c  in CNF:
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_2
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_1
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_0
c  in DIMACS:
 20855  20856 -20857  1043 -20858 0
 20855  20856 -20857  1043 -20859 0
 20855  20856 -20857  1043 -20860 0

c  0-1 --> -1
c    (-b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧ -p_1043) -> ( b^{149, 8}_2 ∧ -b^{149, 8}_1 ∧  b^{149, 8}_0)
c  in CNF:
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨  b^{149, 8}_2
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_1
c     b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨  b^{149, 8}_0
c  in DIMACS:
 20855  20856  20857  1043  20858 0
 20855  20856  20857  1043 -20859 0
 20855  20856  20857  1043  20860 0

c  -1-1 --> -2
c    ( b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧  b^{149, 7}_0 ∧ -p_1043) -> ( b^{149, 8}_2 ∧  b^{149, 8}_1 ∧ -b^{149, 8}_0)
c  in CNF:
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨  b^{149, 8}_2
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨  b^{149, 8}_1
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨  p_1043 ∨ -b^{149, 8}_0
c  in DIMACS:
-20855  20856 -20857  1043  20858 0
-20855  20856 -20857  1043  20859 0
-20855  20856 -20857  1043 -20860 0

c  -2-1 --> break 
c    ( b^{149, 7}_2 ∧  b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧ -p_1043) -> break
c  in CNF:
c    -b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨  b^{149, 7}_0 ∨  p_1043 ∨ break
c  in DIMACS:
-20855 -20856  20857  1043 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{149, 7}_2 ∧ -b^{149, 7}_1 ∧ -b^{149, 7}_0 ∧ true) 
c  in CNF:
c    -b^{149, 7}_2 ∨  b^{149, 7}_1 ∨  b^{149, 7}_0 ∨ false 
c  in DIMACS:
-20855  20856  20857  0

c  3 does not represent an automaton state.
c    -(-b^{149, 7}_2 ∧  b^{149, 7}_1 ∧  b^{149, 7}_0 ∧ true) 
c  in CNF:
c     b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ false 
c  in DIMACS:
 20855 -20856 -20857  0
c  -3 does not represent an automaton state.
c    -( b^{149, 7}_2 ∧  b^{149, 7}_1 ∧  b^{149, 7}_0 ∧ true) 
c  in CNF:
c    -b^{149, 7}_2 ∨ -b^{149, 7}_1 ∨ -b^{149, 7}_0 ∨ false 
c  in DIMACS:
-20855 -20856 -20857  0

c INIT for k = 150
c    -b^{150, 1}_2
c    -b^{150, 1}_1
c    -b^{150, 1}_0
c  in DIMACS:
-20861 0
-20862 0
-20863 0

c Transitions for k = 150
c i = 1
c  -2+1 --> -1
c    ( b^{150, 1}_2 ∧  b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧  p_150) -> ( b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0)
c  in CNF:
c    -b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨  b^{150, 2}_2
c    -b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_1
c    -b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨  b^{150, 2}_0
c  in DIMACS:
-20861 -20862  20863 -150  20864 0
-20861 -20862  20863 -150 -20865 0
-20861 -20862  20863 -150  20866 0

c  -1+1 --> 0
c    ( b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧  b^{150, 1}_0 ∧  p_150) -> (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧ -b^{150, 2}_0)
c  in CNF:
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_2
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_1
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_0
c  in DIMACS:
-20861  20862 -20863 -150 -20864 0
-20861  20862 -20863 -150 -20865 0
-20861  20862 -20863 -150 -20866 0

c  0+1 --> 1
c    (-b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧  p_150) -> (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0)
c  in CNF:
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_2
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_1
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨  b^{150, 2}_0
c  in DIMACS:
 20861  20862  20863 -150 -20864 0
 20861  20862  20863 -150 -20865 0
 20861  20862  20863 -150  20866 0

c  1+1 --> 2
c    (-b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧  b^{150, 1}_0 ∧  p_150) -> (-b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0)
c  in CNF:
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_2
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨  b^{150, 2}_1
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ -p_150 ∨ -b^{150, 2}_0
c  in DIMACS:
 20861  20862 -20863 -150 -20864 0
 20861  20862 -20863 -150  20865 0
 20861  20862 -20863 -150 -20866 0

c  2+1 --> break 
c    (-b^{150, 1}_2 ∧  b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧  p_150) -> break
c  in CNF:
c     b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ -p_150 ∨ break
c  in DIMACS:
 20861 -20862  20863 -150 1162 0


c  2-1 --> 1
c    (-b^{150, 1}_2 ∧  b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧ -p_150) -> (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0)
c  in CNF:
c     b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_2
c     b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_1
c     b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨  b^{150, 2}_0
c  in DIMACS:
 20861 -20862  20863  150 -20864 0
 20861 -20862  20863  150 -20865 0
 20861 -20862  20863  150  20866 0

c  1-1 --> 0
c    (-b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧  b^{150, 1}_0 ∧ -p_150) -> (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧ -b^{150, 2}_0)
c  in CNF:
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_2
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_1
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_0
c  in DIMACS:
 20861  20862 -20863  150 -20864 0
 20861  20862 -20863  150 -20865 0
 20861  20862 -20863  150 -20866 0

c  0-1 --> -1
c    (-b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧ -p_150) -> ( b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0)
c  in CNF:
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨  b^{150, 2}_2
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_1
c     b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨  b^{150, 2}_0
c  in DIMACS:
 20861  20862  20863  150  20864 0
 20861  20862  20863  150 -20865 0
 20861  20862  20863  150  20866 0

c  -1-1 --> -2
c    ( b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧  b^{150, 1}_0 ∧ -p_150) -> ( b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0)
c  in CNF:
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨  b^{150, 2}_2
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨  b^{150, 2}_1
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨  p_150 ∨ -b^{150, 2}_0
c  in DIMACS:
-20861  20862 -20863  150  20864 0
-20861  20862 -20863  150  20865 0
-20861  20862 -20863  150 -20866 0

c  -2-1 --> break 
c    ( b^{150, 1}_2 ∧  b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧ -p_150) -> break
c  in CNF:
c    -b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨  b^{150, 1}_0 ∨  p_150 ∨ break
c  in DIMACS:
-20861 -20862  20863  150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 1}_2 ∧ -b^{150, 1}_1 ∧ -b^{150, 1}_0 ∧ true) 
c  in CNF:
c    -b^{150, 1}_2 ∨  b^{150, 1}_1 ∨  b^{150, 1}_0 ∨ false 
c  in DIMACS:
-20861  20862  20863  0

c  3 does not represent an automaton state.
c    -(-b^{150, 1}_2 ∧  b^{150, 1}_1 ∧  b^{150, 1}_0 ∧ true) 
c  in CNF:
c     b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ false 
c  in DIMACS:
 20861 -20862 -20863  0
c  -3 does not represent an automaton state.
c    -( b^{150, 1}_2 ∧  b^{150, 1}_1 ∧  b^{150, 1}_0 ∧ true) 
c  in CNF:
c    -b^{150, 1}_2 ∨ -b^{150, 1}_1 ∨ -b^{150, 1}_0 ∨ false 
c  in DIMACS:
-20861 -20862 -20863  0

c i = 2
c  -2+1 --> -1
c    ( b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧  p_300) -> ( b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0)
c  in CNF:
c    -b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨  b^{150, 3}_2
c    -b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_1
c    -b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨  b^{150, 3}_0
c  in DIMACS:
-20864 -20865  20866 -300  20867 0
-20864 -20865  20866 -300 -20868 0
-20864 -20865  20866 -300  20869 0

c  -1+1 --> 0
c    ( b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0 ∧  p_300) -> (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧ -b^{150, 3}_0)
c  in CNF:
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_2
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_1
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_0
c  in DIMACS:
-20864  20865 -20866 -300 -20867 0
-20864  20865 -20866 -300 -20868 0
-20864  20865 -20866 -300 -20869 0

c  0+1 --> 1
c    (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧  p_300) -> (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0)
c  in CNF:
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_2
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_1
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨  b^{150, 3}_0
c  in DIMACS:
 20864  20865  20866 -300 -20867 0
 20864  20865  20866 -300 -20868 0
 20864  20865  20866 -300  20869 0

c  1+1 --> 2
c    (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0 ∧  p_300) -> (-b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0)
c  in CNF:
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_2
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨  b^{150, 3}_1
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ -p_300 ∨ -b^{150, 3}_0
c  in DIMACS:
 20864  20865 -20866 -300 -20867 0
 20864  20865 -20866 -300  20868 0
 20864  20865 -20866 -300 -20869 0

c  2+1 --> break 
c    (-b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧  p_300) -> break
c  in CNF:
c     b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 20864 -20865  20866 -300 1162 0


c  2-1 --> 1
c    (-b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧ -p_300) -> (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0)
c  in CNF:
c     b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_2
c     b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_1
c     b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨  b^{150, 3}_0
c  in DIMACS:
 20864 -20865  20866  300 -20867 0
 20864 -20865  20866  300 -20868 0
 20864 -20865  20866  300  20869 0

c  1-1 --> 0
c    (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0 ∧ -p_300) -> (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧ -b^{150, 3}_0)
c  in CNF:
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_2
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_1
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_0
c  in DIMACS:
 20864  20865 -20866  300 -20867 0
 20864  20865 -20866  300 -20868 0
 20864  20865 -20866  300 -20869 0

c  0-1 --> -1
c    (-b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧ -p_300) -> ( b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0)
c  in CNF:
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨  b^{150, 3}_2
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_1
c     b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨  b^{150, 3}_0
c  in DIMACS:
 20864  20865  20866  300  20867 0
 20864  20865  20866  300 -20868 0
 20864  20865  20866  300  20869 0

c  -1-1 --> -2
c    ( b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧  b^{150, 2}_0 ∧ -p_300) -> ( b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0)
c  in CNF:
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨  b^{150, 3}_2
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨  b^{150, 3}_1
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨  p_300 ∨ -b^{150, 3}_0
c  in DIMACS:
-20864  20865 -20866  300  20867 0
-20864  20865 -20866  300  20868 0
-20864  20865 -20866  300 -20869 0

c  -2-1 --> break 
c    ( b^{150, 2}_2 ∧  b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨  b^{150, 2}_0 ∨  p_300 ∨ break
c  in DIMACS:
-20864 -20865  20866  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 2}_2 ∧ -b^{150, 2}_1 ∧ -b^{150, 2}_0 ∧ true) 
c  in CNF:
c    -b^{150, 2}_2 ∨  b^{150, 2}_1 ∨  b^{150, 2}_0 ∨ false 
c  in DIMACS:
-20864  20865  20866  0

c  3 does not represent an automaton state.
c    -(-b^{150, 2}_2 ∧  b^{150, 2}_1 ∧  b^{150, 2}_0 ∧ true) 
c  in CNF:
c     b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ false 
c  in DIMACS:
 20864 -20865 -20866  0
c  -3 does not represent an automaton state.
c    -( b^{150, 2}_2 ∧  b^{150, 2}_1 ∧  b^{150, 2}_0 ∧ true) 
c  in CNF:
c    -b^{150, 2}_2 ∨ -b^{150, 2}_1 ∨ -b^{150, 2}_0 ∨ false 
c  in DIMACS:
-20864 -20865 -20866  0

c i = 3
c  -2+1 --> -1
c    ( b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧  p_450) -> ( b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0)
c  in CNF:
c    -b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨  b^{150, 4}_2
c    -b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_1
c    -b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨  b^{150, 4}_0
c  in DIMACS:
-20867 -20868  20869 -450  20870 0
-20867 -20868  20869 -450 -20871 0
-20867 -20868  20869 -450  20872 0

c  -1+1 --> 0
c    ( b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0 ∧  p_450) -> (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧ -b^{150, 4}_0)
c  in CNF:
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_2
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_1
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_0
c  in DIMACS:
-20867  20868 -20869 -450 -20870 0
-20867  20868 -20869 -450 -20871 0
-20867  20868 -20869 -450 -20872 0

c  0+1 --> 1
c    (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧  p_450) -> (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0)
c  in CNF:
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_2
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_1
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨  b^{150, 4}_0
c  in DIMACS:
 20867  20868  20869 -450 -20870 0
 20867  20868  20869 -450 -20871 0
 20867  20868  20869 -450  20872 0

c  1+1 --> 2
c    (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0 ∧  p_450) -> (-b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0)
c  in CNF:
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_2
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨  b^{150, 4}_1
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ -p_450 ∨ -b^{150, 4}_0
c  in DIMACS:
 20867  20868 -20869 -450 -20870 0
 20867  20868 -20869 -450  20871 0
 20867  20868 -20869 -450 -20872 0

c  2+1 --> break 
c    (-b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧  p_450) -> break
c  in CNF:
c     b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 20867 -20868  20869 -450 1162 0


c  2-1 --> 1
c    (-b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧ -p_450) -> (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0)
c  in CNF:
c     b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_2
c     b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_1
c     b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨  b^{150, 4}_0
c  in DIMACS:
 20867 -20868  20869  450 -20870 0
 20867 -20868  20869  450 -20871 0
 20867 -20868  20869  450  20872 0

c  1-1 --> 0
c    (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0 ∧ -p_450) -> (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧ -b^{150, 4}_0)
c  in CNF:
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_2
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_1
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_0
c  in DIMACS:
 20867  20868 -20869  450 -20870 0
 20867  20868 -20869  450 -20871 0
 20867  20868 -20869  450 -20872 0

c  0-1 --> -1
c    (-b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧ -p_450) -> ( b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0)
c  in CNF:
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨  b^{150, 4}_2
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_1
c     b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨  b^{150, 4}_0
c  in DIMACS:
 20867  20868  20869  450  20870 0
 20867  20868  20869  450 -20871 0
 20867  20868  20869  450  20872 0

c  -1-1 --> -2
c    ( b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧  b^{150, 3}_0 ∧ -p_450) -> ( b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0)
c  in CNF:
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨  b^{150, 4}_2
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨  b^{150, 4}_1
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨  p_450 ∨ -b^{150, 4}_0
c  in DIMACS:
-20867  20868 -20869  450  20870 0
-20867  20868 -20869  450  20871 0
-20867  20868 -20869  450 -20872 0

c  -2-1 --> break 
c    ( b^{150, 3}_2 ∧  b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨  b^{150, 3}_0 ∨  p_450 ∨ break
c  in DIMACS:
-20867 -20868  20869  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 3}_2 ∧ -b^{150, 3}_1 ∧ -b^{150, 3}_0 ∧ true) 
c  in CNF:
c    -b^{150, 3}_2 ∨  b^{150, 3}_1 ∨  b^{150, 3}_0 ∨ false 
c  in DIMACS:
-20867  20868  20869  0

c  3 does not represent an automaton state.
c    -(-b^{150, 3}_2 ∧  b^{150, 3}_1 ∧  b^{150, 3}_0 ∧ true) 
c  in CNF:
c     b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ false 
c  in DIMACS:
 20867 -20868 -20869  0
c  -3 does not represent an automaton state.
c    -( b^{150, 3}_2 ∧  b^{150, 3}_1 ∧  b^{150, 3}_0 ∧ true) 
c  in CNF:
c    -b^{150, 3}_2 ∨ -b^{150, 3}_1 ∨ -b^{150, 3}_0 ∨ false 
c  in DIMACS:
-20867 -20868 -20869  0

c i = 4
c  -2+1 --> -1
c    ( b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧  p_600) -> ( b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0)
c  in CNF:
c    -b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨  b^{150, 5}_2
c    -b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_1
c    -b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨  b^{150, 5}_0
c  in DIMACS:
-20870 -20871  20872 -600  20873 0
-20870 -20871  20872 -600 -20874 0
-20870 -20871  20872 -600  20875 0

c  -1+1 --> 0
c    ( b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0 ∧  p_600) -> (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧ -b^{150, 5}_0)
c  in CNF:
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_2
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_1
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_0
c  in DIMACS:
-20870  20871 -20872 -600 -20873 0
-20870  20871 -20872 -600 -20874 0
-20870  20871 -20872 -600 -20875 0

c  0+1 --> 1
c    (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧  p_600) -> (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0)
c  in CNF:
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_2
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_1
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨  b^{150, 5}_0
c  in DIMACS:
 20870  20871  20872 -600 -20873 0
 20870  20871  20872 -600 -20874 0
 20870  20871  20872 -600  20875 0

c  1+1 --> 2
c    (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0 ∧  p_600) -> (-b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0)
c  in CNF:
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_2
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨  b^{150, 5}_1
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ -p_600 ∨ -b^{150, 5}_0
c  in DIMACS:
 20870  20871 -20872 -600 -20873 0
 20870  20871 -20872 -600  20874 0
 20870  20871 -20872 -600 -20875 0

c  2+1 --> break 
c    (-b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧  p_600) -> break
c  in CNF:
c     b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 20870 -20871  20872 -600 1162 0


c  2-1 --> 1
c    (-b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧ -p_600) -> (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0)
c  in CNF:
c     b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_2
c     b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_1
c     b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨  b^{150, 5}_0
c  in DIMACS:
 20870 -20871  20872  600 -20873 0
 20870 -20871  20872  600 -20874 0
 20870 -20871  20872  600  20875 0

c  1-1 --> 0
c    (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0 ∧ -p_600) -> (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧ -b^{150, 5}_0)
c  in CNF:
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_2
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_1
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_0
c  in DIMACS:
 20870  20871 -20872  600 -20873 0
 20870  20871 -20872  600 -20874 0
 20870  20871 -20872  600 -20875 0

c  0-1 --> -1
c    (-b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧ -p_600) -> ( b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0)
c  in CNF:
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨  b^{150, 5}_2
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_1
c     b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨  b^{150, 5}_0
c  in DIMACS:
 20870  20871  20872  600  20873 0
 20870  20871  20872  600 -20874 0
 20870  20871  20872  600  20875 0

c  -1-1 --> -2
c    ( b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧  b^{150, 4}_0 ∧ -p_600) -> ( b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0)
c  in CNF:
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨  b^{150, 5}_2
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨  b^{150, 5}_1
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨  p_600 ∨ -b^{150, 5}_0
c  in DIMACS:
-20870  20871 -20872  600  20873 0
-20870  20871 -20872  600  20874 0
-20870  20871 -20872  600 -20875 0

c  -2-1 --> break 
c    ( b^{150, 4}_2 ∧  b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨  b^{150, 4}_0 ∨  p_600 ∨ break
c  in DIMACS:
-20870 -20871  20872  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 4}_2 ∧ -b^{150, 4}_1 ∧ -b^{150, 4}_0 ∧ true) 
c  in CNF:
c    -b^{150, 4}_2 ∨  b^{150, 4}_1 ∨  b^{150, 4}_0 ∨ false 
c  in DIMACS:
-20870  20871  20872  0

c  3 does not represent an automaton state.
c    -(-b^{150, 4}_2 ∧  b^{150, 4}_1 ∧  b^{150, 4}_0 ∧ true) 
c  in CNF:
c     b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ false 
c  in DIMACS:
 20870 -20871 -20872  0
c  -3 does not represent an automaton state.
c    -( b^{150, 4}_2 ∧  b^{150, 4}_1 ∧  b^{150, 4}_0 ∧ true) 
c  in CNF:
c    -b^{150, 4}_2 ∨ -b^{150, 4}_1 ∨ -b^{150, 4}_0 ∨ false 
c  in DIMACS:
-20870 -20871 -20872  0

c i = 5
c  -2+1 --> -1
c    ( b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧  p_750) -> ( b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0)
c  in CNF:
c    -b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨  b^{150, 6}_2
c    -b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_1
c    -b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨  b^{150, 6}_0
c  in DIMACS:
-20873 -20874  20875 -750  20876 0
-20873 -20874  20875 -750 -20877 0
-20873 -20874  20875 -750  20878 0

c  -1+1 --> 0
c    ( b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0 ∧  p_750) -> (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧ -b^{150, 6}_0)
c  in CNF:
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_2
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_1
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_0
c  in DIMACS:
-20873  20874 -20875 -750 -20876 0
-20873  20874 -20875 -750 -20877 0
-20873  20874 -20875 -750 -20878 0

c  0+1 --> 1
c    (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧  p_750) -> (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0)
c  in CNF:
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_2
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_1
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨  b^{150, 6}_0
c  in DIMACS:
 20873  20874  20875 -750 -20876 0
 20873  20874  20875 -750 -20877 0
 20873  20874  20875 -750  20878 0

c  1+1 --> 2
c    (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0 ∧  p_750) -> (-b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0)
c  in CNF:
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_2
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨  b^{150, 6}_1
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ -p_750 ∨ -b^{150, 6}_0
c  in DIMACS:
 20873  20874 -20875 -750 -20876 0
 20873  20874 -20875 -750  20877 0
 20873  20874 -20875 -750 -20878 0

c  2+1 --> break 
c    (-b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧  p_750) -> break
c  in CNF:
c     b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 20873 -20874  20875 -750 1162 0


c  2-1 --> 1
c    (-b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧ -p_750) -> (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0)
c  in CNF:
c     b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_2
c     b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_1
c     b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨  b^{150, 6}_0
c  in DIMACS:
 20873 -20874  20875  750 -20876 0
 20873 -20874  20875  750 -20877 0
 20873 -20874  20875  750  20878 0

c  1-1 --> 0
c    (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0 ∧ -p_750) -> (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧ -b^{150, 6}_0)
c  in CNF:
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_2
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_1
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_0
c  in DIMACS:
 20873  20874 -20875  750 -20876 0
 20873  20874 -20875  750 -20877 0
 20873  20874 -20875  750 -20878 0

c  0-1 --> -1
c    (-b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧ -p_750) -> ( b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0)
c  in CNF:
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨  b^{150, 6}_2
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_1
c     b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨  b^{150, 6}_0
c  in DIMACS:
 20873  20874  20875  750  20876 0
 20873  20874  20875  750 -20877 0
 20873  20874  20875  750  20878 0

c  -1-1 --> -2
c    ( b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧  b^{150, 5}_0 ∧ -p_750) -> ( b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0)
c  in CNF:
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨  b^{150, 6}_2
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨  b^{150, 6}_1
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨  p_750 ∨ -b^{150, 6}_0
c  in DIMACS:
-20873  20874 -20875  750  20876 0
-20873  20874 -20875  750  20877 0
-20873  20874 -20875  750 -20878 0

c  -2-1 --> break 
c    ( b^{150, 5}_2 ∧  b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨  b^{150, 5}_0 ∨  p_750 ∨ break
c  in DIMACS:
-20873 -20874  20875  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 5}_2 ∧ -b^{150, 5}_1 ∧ -b^{150, 5}_0 ∧ true) 
c  in CNF:
c    -b^{150, 5}_2 ∨  b^{150, 5}_1 ∨  b^{150, 5}_0 ∨ false 
c  in DIMACS:
-20873  20874  20875  0

c  3 does not represent an automaton state.
c    -(-b^{150, 5}_2 ∧  b^{150, 5}_1 ∧  b^{150, 5}_0 ∧ true) 
c  in CNF:
c     b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ false 
c  in DIMACS:
 20873 -20874 -20875  0
c  -3 does not represent an automaton state.
c    -( b^{150, 5}_2 ∧  b^{150, 5}_1 ∧  b^{150, 5}_0 ∧ true) 
c  in CNF:
c    -b^{150, 5}_2 ∨ -b^{150, 5}_1 ∨ -b^{150, 5}_0 ∨ false 
c  in DIMACS:
-20873 -20874 -20875  0

c i = 6
c  -2+1 --> -1
c    ( b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧  p_900) -> ( b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0)
c  in CNF:
c    -b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨  b^{150, 7}_2
c    -b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_1
c    -b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨  b^{150, 7}_0
c  in DIMACS:
-20876 -20877  20878 -900  20879 0
-20876 -20877  20878 -900 -20880 0
-20876 -20877  20878 -900  20881 0

c  -1+1 --> 0
c    ( b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0 ∧  p_900) -> (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧ -b^{150, 7}_0)
c  in CNF:
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_2
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_1
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_0
c  in DIMACS:
-20876  20877 -20878 -900 -20879 0
-20876  20877 -20878 -900 -20880 0
-20876  20877 -20878 -900 -20881 0

c  0+1 --> 1
c    (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧  p_900) -> (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0)
c  in CNF:
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_2
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_1
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨  b^{150, 7}_0
c  in DIMACS:
 20876  20877  20878 -900 -20879 0
 20876  20877  20878 -900 -20880 0
 20876  20877  20878 -900  20881 0

c  1+1 --> 2
c    (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0 ∧  p_900) -> (-b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0)
c  in CNF:
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_2
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨  b^{150, 7}_1
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ -p_900 ∨ -b^{150, 7}_0
c  in DIMACS:
 20876  20877 -20878 -900 -20879 0
 20876  20877 -20878 -900  20880 0
 20876  20877 -20878 -900 -20881 0

c  2+1 --> break 
c    (-b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧  p_900) -> break
c  in CNF:
c     b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 20876 -20877  20878 -900 1162 0


c  2-1 --> 1
c    (-b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧ -p_900) -> (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0)
c  in CNF:
c     b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_2
c     b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_1
c     b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨  b^{150, 7}_0
c  in DIMACS:
 20876 -20877  20878  900 -20879 0
 20876 -20877  20878  900 -20880 0
 20876 -20877  20878  900  20881 0

c  1-1 --> 0
c    (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0 ∧ -p_900) -> (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧ -b^{150, 7}_0)
c  in CNF:
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_2
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_1
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_0
c  in DIMACS:
 20876  20877 -20878  900 -20879 0
 20876  20877 -20878  900 -20880 0
 20876  20877 -20878  900 -20881 0

c  0-1 --> -1
c    (-b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧ -p_900) -> ( b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0)
c  in CNF:
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨  b^{150, 7}_2
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_1
c     b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨  b^{150, 7}_0
c  in DIMACS:
 20876  20877  20878  900  20879 0
 20876  20877  20878  900 -20880 0
 20876  20877  20878  900  20881 0

c  -1-1 --> -2
c    ( b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧  b^{150, 6}_0 ∧ -p_900) -> ( b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0)
c  in CNF:
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨  b^{150, 7}_2
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨  b^{150, 7}_1
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨  p_900 ∨ -b^{150, 7}_0
c  in DIMACS:
-20876  20877 -20878  900  20879 0
-20876  20877 -20878  900  20880 0
-20876  20877 -20878  900 -20881 0

c  -2-1 --> break 
c    ( b^{150, 6}_2 ∧  b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨  b^{150, 6}_0 ∨  p_900 ∨ break
c  in DIMACS:
-20876 -20877  20878  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 6}_2 ∧ -b^{150, 6}_1 ∧ -b^{150, 6}_0 ∧ true) 
c  in CNF:
c    -b^{150, 6}_2 ∨  b^{150, 6}_1 ∨  b^{150, 6}_0 ∨ false 
c  in DIMACS:
-20876  20877  20878  0

c  3 does not represent an automaton state.
c    -(-b^{150, 6}_2 ∧  b^{150, 6}_1 ∧  b^{150, 6}_0 ∧ true) 
c  in CNF:
c     b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ false 
c  in DIMACS:
 20876 -20877 -20878  0
c  -3 does not represent an automaton state.
c    -( b^{150, 6}_2 ∧  b^{150, 6}_1 ∧  b^{150, 6}_0 ∧ true) 
c  in CNF:
c    -b^{150, 6}_2 ∨ -b^{150, 6}_1 ∨ -b^{150, 6}_0 ∨ false 
c  in DIMACS:
-20876 -20877 -20878  0

c i = 7
c  -2+1 --> -1
c    ( b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧  p_1050) -> ( b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧  b^{150, 8}_0)
c  in CNF:
c    -b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨  b^{150, 8}_2
c    -b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_1
c    -b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨  b^{150, 8}_0
c  in DIMACS:
-20879 -20880  20881 -1050  20882 0
-20879 -20880  20881 -1050 -20883 0
-20879 -20880  20881 -1050  20884 0

c  -1+1 --> 0
c    ( b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0 ∧  p_1050) -> (-b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧ -b^{150, 8}_0)
c  in CNF:
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_2
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_1
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_0
c  in DIMACS:
-20879  20880 -20881 -1050 -20882 0
-20879  20880 -20881 -1050 -20883 0
-20879  20880 -20881 -1050 -20884 0

c  0+1 --> 1
c    (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧  p_1050) -> (-b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧  b^{150, 8}_0)
c  in CNF:
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_2
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_1
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨  b^{150, 8}_0
c  in DIMACS:
 20879  20880  20881 -1050 -20882 0
 20879  20880  20881 -1050 -20883 0
 20879  20880  20881 -1050  20884 0

c  1+1 --> 2
c    (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0 ∧  p_1050) -> (-b^{150, 8}_2 ∧  b^{150, 8}_1 ∧ -b^{150, 8}_0)
c  in CNF:
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_2
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨  b^{150, 8}_1
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ -p_1050 ∨ -b^{150, 8}_0
c  in DIMACS:
 20879  20880 -20881 -1050 -20882 0
 20879  20880 -20881 -1050  20883 0
 20879  20880 -20881 -1050 -20884 0

c  2+1 --> break 
c    (-b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 20879 -20880  20881 -1050 1162 0


c  2-1 --> 1
c    (-b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧ -p_1050) -> (-b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧  b^{150, 8}_0)
c  in CNF:
c     b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_2
c     b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_1
c     b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨  b^{150, 8}_0
c  in DIMACS:
 20879 -20880  20881  1050 -20882 0
 20879 -20880  20881  1050 -20883 0
 20879 -20880  20881  1050  20884 0

c  1-1 --> 0
c    (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0 ∧ -p_1050) -> (-b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧ -b^{150, 8}_0)
c  in CNF:
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_2
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_1
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_0
c  in DIMACS:
 20879  20880 -20881  1050 -20882 0
 20879  20880 -20881  1050 -20883 0
 20879  20880 -20881  1050 -20884 0

c  0-1 --> -1
c    (-b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧ -p_1050) -> ( b^{150, 8}_2 ∧ -b^{150, 8}_1 ∧  b^{150, 8}_0)
c  in CNF:
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨  b^{150, 8}_2
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_1
c     b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨  b^{150, 8}_0
c  in DIMACS:
 20879  20880  20881  1050  20882 0
 20879  20880  20881  1050 -20883 0
 20879  20880  20881  1050  20884 0

c  -1-1 --> -2
c    ( b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧  b^{150, 7}_0 ∧ -p_1050) -> ( b^{150, 8}_2 ∧  b^{150, 8}_1 ∧ -b^{150, 8}_0)
c  in CNF:
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨  b^{150, 8}_2
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨  b^{150, 8}_1
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨  p_1050 ∨ -b^{150, 8}_0
c  in DIMACS:
-20879  20880 -20881  1050  20882 0
-20879  20880 -20881  1050  20883 0
-20879  20880 -20881  1050 -20884 0

c  -2-1 --> break 
c    ( b^{150, 7}_2 ∧  b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨  b^{150, 7}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-20879 -20880  20881  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{150, 7}_2 ∧ -b^{150, 7}_1 ∧ -b^{150, 7}_0 ∧ true) 
c  in CNF:
c    -b^{150, 7}_2 ∨  b^{150, 7}_1 ∨  b^{150, 7}_0 ∨ false 
c  in DIMACS:
-20879  20880  20881  0

c  3 does not represent an automaton state.
c    -(-b^{150, 7}_2 ∧  b^{150, 7}_1 ∧  b^{150, 7}_0 ∧ true) 
c  in CNF:
c     b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ false 
c  in DIMACS:
 20879 -20880 -20881  0
c  -3 does not represent an automaton state.
c    -( b^{150, 7}_2 ∧  b^{150, 7}_1 ∧  b^{150, 7}_0 ∧ true) 
c  in CNF:
c    -b^{150, 7}_2 ∨ -b^{150, 7}_1 ∨ -b^{150, 7}_0 ∨ false 
c  in DIMACS:
-20879 -20880 -20881  0

c INIT for k = 151
c    -b^{151, 1}_2
c    -b^{151, 1}_1
c    -b^{151, 1}_0
c  in DIMACS:
-20885 0
-20886 0
-20887 0

c Transitions for k = 151
c i = 1
c  -2+1 --> -1
c    ( b^{151, 1}_2 ∧  b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧  p_151) -> ( b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0)
c  in CNF:
c    -b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨  b^{151, 2}_2
c    -b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_1
c    -b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨  b^{151, 2}_0
c  in DIMACS:
-20885 -20886  20887 -151  20888 0
-20885 -20886  20887 -151 -20889 0
-20885 -20886  20887 -151  20890 0

c  -1+1 --> 0
c    ( b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧  b^{151, 1}_0 ∧  p_151) -> (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧ -b^{151, 2}_0)
c  in CNF:
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_2
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_1
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_0
c  in DIMACS:
-20885  20886 -20887 -151 -20888 0
-20885  20886 -20887 -151 -20889 0
-20885  20886 -20887 -151 -20890 0

c  0+1 --> 1
c    (-b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧  p_151) -> (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0)
c  in CNF:
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_2
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_1
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨  b^{151, 2}_0
c  in DIMACS:
 20885  20886  20887 -151 -20888 0
 20885  20886  20887 -151 -20889 0
 20885  20886  20887 -151  20890 0

c  1+1 --> 2
c    (-b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧  b^{151, 1}_0 ∧  p_151) -> (-b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0)
c  in CNF:
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_2
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨  b^{151, 2}_1
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ -p_151 ∨ -b^{151, 2}_0
c  in DIMACS:
 20885  20886 -20887 -151 -20888 0
 20885  20886 -20887 -151  20889 0
 20885  20886 -20887 -151 -20890 0

c  2+1 --> break 
c    (-b^{151, 1}_2 ∧  b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧  p_151) -> break
c  in CNF:
c     b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ -p_151 ∨ break
c  in DIMACS:
 20885 -20886  20887 -151 1162 0


c  2-1 --> 1
c    (-b^{151, 1}_2 ∧  b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧ -p_151) -> (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0)
c  in CNF:
c     b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_2
c     b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_1
c     b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨  b^{151, 2}_0
c  in DIMACS:
 20885 -20886  20887  151 -20888 0
 20885 -20886  20887  151 -20889 0
 20885 -20886  20887  151  20890 0

c  1-1 --> 0
c    (-b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧  b^{151, 1}_0 ∧ -p_151) -> (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧ -b^{151, 2}_0)
c  in CNF:
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_2
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_1
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_0
c  in DIMACS:
 20885  20886 -20887  151 -20888 0
 20885  20886 -20887  151 -20889 0
 20885  20886 -20887  151 -20890 0

c  0-1 --> -1
c    (-b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧ -p_151) -> ( b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0)
c  in CNF:
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨  b^{151, 2}_2
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_1
c     b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨  b^{151, 2}_0
c  in DIMACS:
 20885  20886  20887  151  20888 0
 20885  20886  20887  151 -20889 0
 20885  20886  20887  151  20890 0

c  -1-1 --> -2
c    ( b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧  b^{151, 1}_0 ∧ -p_151) -> ( b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0)
c  in CNF:
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨  b^{151, 2}_2
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨  b^{151, 2}_1
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨  p_151 ∨ -b^{151, 2}_0
c  in DIMACS:
-20885  20886 -20887  151  20888 0
-20885  20886 -20887  151  20889 0
-20885  20886 -20887  151 -20890 0

c  -2-1 --> break 
c    ( b^{151, 1}_2 ∧  b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧ -p_151) -> break
c  in CNF:
c    -b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨  b^{151, 1}_0 ∨  p_151 ∨ break
c  in DIMACS:
-20885 -20886  20887  151 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 1}_2 ∧ -b^{151, 1}_1 ∧ -b^{151, 1}_0 ∧ true) 
c  in CNF:
c    -b^{151, 1}_2 ∨  b^{151, 1}_1 ∨  b^{151, 1}_0 ∨ false 
c  in DIMACS:
-20885  20886  20887  0

c  3 does not represent an automaton state.
c    -(-b^{151, 1}_2 ∧  b^{151, 1}_1 ∧  b^{151, 1}_0 ∧ true) 
c  in CNF:
c     b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ false 
c  in DIMACS:
 20885 -20886 -20887  0
c  -3 does not represent an automaton state.
c    -( b^{151, 1}_2 ∧  b^{151, 1}_1 ∧  b^{151, 1}_0 ∧ true) 
c  in CNF:
c    -b^{151, 1}_2 ∨ -b^{151, 1}_1 ∨ -b^{151, 1}_0 ∨ false 
c  in DIMACS:
-20885 -20886 -20887  0

c i = 2
c  -2+1 --> -1
c    ( b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧  p_302) -> ( b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0)
c  in CNF:
c    -b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨  b^{151, 3}_2
c    -b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_1
c    -b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨  b^{151, 3}_0
c  in DIMACS:
-20888 -20889  20890 -302  20891 0
-20888 -20889  20890 -302 -20892 0
-20888 -20889  20890 -302  20893 0

c  -1+1 --> 0
c    ( b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0 ∧  p_302) -> (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧ -b^{151, 3}_0)
c  in CNF:
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_2
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_1
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_0
c  in DIMACS:
-20888  20889 -20890 -302 -20891 0
-20888  20889 -20890 -302 -20892 0
-20888  20889 -20890 -302 -20893 0

c  0+1 --> 1
c    (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧  p_302) -> (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0)
c  in CNF:
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_2
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_1
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨  b^{151, 3}_0
c  in DIMACS:
 20888  20889  20890 -302 -20891 0
 20888  20889  20890 -302 -20892 0
 20888  20889  20890 -302  20893 0

c  1+1 --> 2
c    (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0 ∧  p_302) -> (-b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0)
c  in CNF:
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_2
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨  b^{151, 3}_1
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ -p_302 ∨ -b^{151, 3}_0
c  in DIMACS:
 20888  20889 -20890 -302 -20891 0
 20888  20889 -20890 -302  20892 0
 20888  20889 -20890 -302 -20893 0

c  2+1 --> break 
c    (-b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧  p_302) -> break
c  in CNF:
c     b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ -p_302 ∨ break
c  in DIMACS:
 20888 -20889  20890 -302 1162 0


c  2-1 --> 1
c    (-b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧ -p_302) -> (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0)
c  in CNF:
c     b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_2
c     b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_1
c     b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨  b^{151, 3}_0
c  in DIMACS:
 20888 -20889  20890  302 -20891 0
 20888 -20889  20890  302 -20892 0
 20888 -20889  20890  302  20893 0

c  1-1 --> 0
c    (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0 ∧ -p_302) -> (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧ -b^{151, 3}_0)
c  in CNF:
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_2
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_1
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_0
c  in DIMACS:
 20888  20889 -20890  302 -20891 0
 20888  20889 -20890  302 -20892 0
 20888  20889 -20890  302 -20893 0

c  0-1 --> -1
c    (-b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧ -p_302) -> ( b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0)
c  in CNF:
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨  b^{151, 3}_2
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_1
c     b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨  b^{151, 3}_0
c  in DIMACS:
 20888  20889  20890  302  20891 0
 20888  20889  20890  302 -20892 0
 20888  20889  20890  302  20893 0

c  -1-1 --> -2
c    ( b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧  b^{151, 2}_0 ∧ -p_302) -> ( b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0)
c  in CNF:
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨  b^{151, 3}_2
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨  b^{151, 3}_1
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨  p_302 ∨ -b^{151, 3}_0
c  in DIMACS:
-20888  20889 -20890  302  20891 0
-20888  20889 -20890  302  20892 0
-20888  20889 -20890  302 -20893 0

c  -2-1 --> break 
c    ( b^{151, 2}_2 ∧  b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧ -p_302) -> break
c  in CNF:
c    -b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨  b^{151, 2}_0 ∨  p_302 ∨ break
c  in DIMACS:
-20888 -20889  20890  302 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 2}_2 ∧ -b^{151, 2}_1 ∧ -b^{151, 2}_0 ∧ true) 
c  in CNF:
c    -b^{151, 2}_2 ∨  b^{151, 2}_1 ∨  b^{151, 2}_0 ∨ false 
c  in DIMACS:
-20888  20889  20890  0

c  3 does not represent an automaton state.
c    -(-b^{151, 2}_2 ∧  b^{151, 2}_1 ∧  b^{151, 2}_0 ∧ true) 
c  in CNF:
c     b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ false 
c  in DIMACS:
 20888 -20889 -20890  0
c  -3 does not represent an automaton state.
c    -( b^{151, 2}_2 ∧  b^{151, 2}_1 ∧  b^{151, 2}_0 ∧ true) 
c  in CNF:
c    -b^{151, 2}_2 ∨ -b^{151, 2}_1 ∨ -b^{151, 2}_0 ∨ false 
c  in DIMACS:
-20888 -20889 -20890  0

c i = 3
c  -2+1 --> -1
c    ( b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧  p_453) -> ( b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0)
c  in CNF:
c    -b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨  b^{151, 4}_2
c    -b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_1
c    -b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨  b^{151, 4}_0
c  in DIMACS:
-20891 -20892  20893 -453  20894 0
-20891 -20892  20893 -453 -20895 0
-20891 -20892  20893 -453  20896 0

c  -1+1 --> 0
c    ( b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0 ∧  p_453) -> (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧ -b^{151, 4}_0)
c  in CNF:
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_2
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_1
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_0
c  in DIMACS:
-20891  20892 -20893 -453 -20894 0
-20891  20892 -20893 -453 -20895 0
-20891  20892 -20893 -453 -20896 0

c  0+1 --> 1
c    (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧  p_453) -> (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0)
c  in CNF:
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_2
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_1
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨  b^{151, 4}_0
c  in DIMACS:
 20891  20892  20893 -453 -20894 0
 20891  20892  20893 -453 -20895 0
 20891  20892  20893 -453  20896 0

c  1+1 --> 2
c    (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0 ∧  p_453) -> (-b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0)
c  in CNF:
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_2
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨  b^{151, 4}_1
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ -p_453 ∨ -b^{151, 4}_0
c  in DIMACS:
 20891  20892 -20893 -453 -20894 0
 20891  20892 -20893 -453  20895 0
 20891  20892 -20893 -453 -20896 0

c  2+1 --> break 
c    (-b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧  p_453) -> break
c  in CNF:
c     b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ -p_453 ∨ break
c  in DIMACS:
 20891 -20892  20893 -453 1162 0


c  2-1 --> 1
c    (-b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧ -p_453) -> (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0)
c  in CNF:
c     b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_2
c     b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_1
c     b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨  b^{151, 4}_0
c  in DIMACS:
 20891 -20892  20893  453 -20894 0
 20891 -20892  20893  453 -20895 0
 20891 -20892  20893  453  20896 0

c  1-1 --> 0
c    (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0 ∧ -p_453) -> (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧ -b^{151, 4}_0)
c  in CNF:
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_2
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_1
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_0
c  in DIMACS:
 20891  20892 -20893  453 -20894 0
 20891  20892 -20893  453 -20895 0
 20891  20892 -20893  453 -20896 0

c  0-1 --> -1
c    (-b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧ -p_453) -> ( b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0)
c  in CNF:
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨  b^{151, 4}_2
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_1
c     b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨  b^{151, 4}_0
c  in DIMACS:
 20891  20892  20893  453  20894 0
 20891  20892  20893  453 -20895 0
 20891  20892  20893  453  20896 0

c  -1-1 --> -2
c    ( b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧  b^{151, 3}_0 ∧ -p_453) -> ( b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0)
c  in CNF:
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨  b^{151, 4}_2
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨  b^{151, 4}_1
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨  p_453 ∨ -b^{151, 4}_0
c  in DIMACS:
-20891  20892 -20893  453  20894 0
-20891  20892 -20893  453  20895 0
-20891  20892 -20893  453 -20896 0

c  -2-1 --> break 
c    ( b^{151, 3}_2 ∧  b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧ -p_453) -> break
c  in CNF:
c    -b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨  b^{151, 3}_0 ∨  p_453 ∨ break
c  in DIMACS:
-20891 -20892  20893  453 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 3}_2 ∧ -b^{151, 3}_1 ∧ -b^{151, 3}_0 ∧ true) 
c  in CNF:
c    -b^{151, 3}_2 ∨  b^{151, 3}_1 ∨  b^{151, 3}_0 ∨ false 
c  in DIMACS:
-20891  20892  20893  0

c  3 does not represent an automaton state.
c    -(-b^{151, 3}_2 ∧  b^{151, 3}_1 ∧  b^{151, 3}_0 ∧ true) 
c  in CNF:
c     b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ false 
c  in DIMACS:
 20891 -20892 -20893  0
c  -3 does not represent an automaton state.
c    -( b^{151, 3}_2 ∧  b^{151, 3}_1 ∧  b^{151, 3}_0 ∧ true) 
c  in CNF:
c    -b^{151, 3}_2 ∨ -b^{151, 3}_1 ∨ -b^{151, 3}_0 ∨ false 
c  in DIMACS:
-20891 -20892 -20893  0

c i = 4
c  -2+1 --> -1
c    ( b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧  p_604) -> ( b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0)
c  in CNF:
c    -b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨  b^{151, 5}_2
c    -b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_1
c    -b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨  b^{151, 5}_0
c  in DIMACS:
-20894 -20895  20896 -604  20897 0
-20894 -20895  20896 -604 -20898 0
-20894 -20895  20896 -604  20899 0

c  -1+1 --> 0
c    ( b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0 ∧  p_604) -> (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧ -b^{151, 5}_0)
c  in CNF:
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_2
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_1
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_0
c  in DIMACS:
-20894  20895 -20896 -604 -20897 0
-20894  20895 -20896 -604 -20898 0
-20894  20895 -20896 -604 -20899 0

c  0+1 --> 1
c    (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧  p_604) -> (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0)
c  in CNF:
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_2
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_1
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨  b^{151, 5}_0
c  in DIMACS:
 20894  20895  20896 -604 -20897 0
 20894  20895  20896 -604 -20898 0
 20894  20895  20896 -604  20899 0

c  1+1 --> 2
c    (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0 ∧  p_604) -> (-b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0)
c  in CNF:
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_2
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨  b^{151, 5}_1
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ -p_604 ∨ -b^{151, 5}_0
c  in DIMACS:
 20894  20895 -20896 -604 -20897 0
 20894  20895 -20896 -604  20898 0
 20894  20895 -20896 -604 -20899 0

c  2+1 --> break 
c    (-b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧  p_604) -> break
c  in CNF:
c     b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ -p_604 ∨ break
c  in DIMACS:
 20894 -20895  20896 -604 1162 0


c  2-1 --> 1
c    (-b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧ -p_604) -> (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0)
c  in CNF:
c     b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_2
c     b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_1
c     b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨  b^{151, 5}_0
c  in DIMACS:
 20894 -20895  20896  604 -20897 0
 20894 -20895  20896  604 -20898 0
 20894 -20895  20896  604  20899 0

c  1-1 --> 0
c    (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0 ∧ -p_604) -> (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧ -b^{151, 5}_0)
c  in CNF:
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_2
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_1
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_0
c  in DIMACS:
 20894  20895 -20896  604 -20897 0
 20894  20895 -20896  604 -20898 0
 20894  20895 -20896  604 -20899 0

c  0-1 --> -1
c    (-b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧ -p_604) -> ( b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0)
c  in CNF:
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨  b^{151, 5}_2
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_1
c     b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨  b^{151, 5}_0
c  in DIMACS:
 20894  20895  20896  604  20897 0
 20894  20895  20896  604 -20898 0
 20894  20895  20896  604  20899 0

c  -1-1 --> -2
c    ( b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧  b^{151, 4}_0 ∧ -p_604) -> ( b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0)
c  in CNF:
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨  b^{151, 5}_2
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨  b^{151, 5}_1
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨  p_604 ∨ -b^{151, 5}_0
c  in DIMACS:
-20894  20895 -20896  604  20897 0
-20894  20895 -20896  604  20898 0
-20894  20895 -20896  604 -20899 0

c  -2-1 --> break 
c    ( b^{151, 4}_2 ∧  b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧ -p_604) -> break
c  in CNF:
c    -b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨  b^{151, 4}_0 ∨  p_604 ∨ break
c  in DIMACS:
-20894 -20895  20896  604 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 4}_2 ∧ -b^{151, 4}_1 ∧ -b^{151, 4}_0 ∧ true) 
c  in CNF:
c    -b^{151, 4}_2 ∨  b^{151, 4}_1 ∨  b^{151, 4}_0 ∨ false 
c  in DIMACS:
-20894  20895  20896  0

c  3 does not represent an automaton state.
c    -(-b^{151, 4}_2 ∧  b^{151, 4}_1 ∧  b^{151, 4}_0 ∧ true) 
c  in CNF:
c     b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ false 
c  in DIMACS:
 20894 -20895 -20896  0
c  -3 does not represent an automaton state.
c    -( b^{151, 4}_2 ∧  b^{151, 4}_1 ∧  b^{151, 4}_0 ∧ true) 
c  in CNF:
c    -b^{151, 4}_2 ∨ -b^{151, 4}_1 ∨ -b^{151, 4}_0 ∨ false 
c  in DIMACS:
-20894 -20895 -20896  0

c i = 5
c  -2+1 --> -1
c    ( b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧  p_755) -> ( b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0)
c  in CNF:
c    -b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨  b^{151, 6}_2
c    -b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_1
c    -b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨  b^{151, 6}_0
c  in DIMACS:
-20897 -20898  20899 -755  20900 0
-20897 -20898  20899 -755 -20901 0
-20897 -20898  20899 -755  20902 0

c  -1+1 --> 0
c    ( b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0 ∧  p_755) -> (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧ -b^{151, 6}_0)
c  in CNF:
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_2
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_1
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_0
c  in DIMACS:
-20897  20898 -20899 -755 -20900 0
-20897  20898 -20899 -755 -20901 0
-20897  20898 -20899 -755 -20902 0

c  0+1 --> 1
c    (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧  p_755) -> (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0)
c  in CNF:
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_2
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_1
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨  b^{151, 6}_0
c  in DIMACS:
 20897  20898  20899 -755 -20900 0
 20897  20898  20899 -755 -20901 0
 20897  20898  20899 -755  20902 0

c  1+1 --> 2
c    (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0 ∧  p_755) -> (-b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0)
c  in CNF:
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_2
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨  b^{151, 6}_1
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ -p_755 ∨ -b^{151, 6}_0
c  in DIMACS:
 20897  20898 -20899 -755 -20900 0
 20897  20898 -20899 -755  20901 0
 20897  20898 -20899 -755 -20902 0

c  2+1 --> break 
c    (-b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧  p_755) -> break
c  in CNF:
c     b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ -p_755 ∨ break
c  in DIMACS:
 20897 -20898  20899 -755 1162 0


c  2-1 --> 1
c    (-b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧ -p_755) -> (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0)
c  in CNF:
c     b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_2
c     b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_1
c     b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨  b^{151, 6}_0
c  in DIMACS:
 20897 -20898  20899  755 -20900 0
 20897 -20898  20899  755 -20901 0
 20897 -20898  20899  755  20902 0

c  1-1 --> 0
c    (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0 ∧ -p_755) -> (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧ -b^{151, 6}_0)
c  in CNF:
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_2
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_1
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_0
c  in DIMACS:
 20897  20898 -20899  755 -20900 0
 20897  20898 -20899  755 -20901 0
 20897  20898 -20899  755 -20902 0

c  0-1 --> -1
c    (-b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧ -p_755) -> ( b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0)
c  in CNF:
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨  b^{151, 6}_2
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_1
c     b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨  b^{151, 6}_0
c  in DIMACS:
 20897  20898  20899  755  20900 0
 20897  20898  20899  755 -20901 0
 20897  20898  20899  755  20902 0

c  -1-1 --> -2
c    ( b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧  b^{151, 5}_0 ∧ -p_755) -> ( b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0)
c  in CNF:
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨  b^{151, 6}_2
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨  b^{151, 6}_1
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨  p_755 ∨ -b^{151, 6}_0
c  in DIMACS:
-20897  20898 -20899  755  20900 0
-20897  20898 -20899  755  20901 0
-20897  20898 -20899  755 -20902 0

c  -2-1 --> break 
c    ( b^{151, 5}_2 ∧  b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧ -p_755) -> break
c  in CNF:
c    -b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨  b^{151, 5}_0 ∨  p_755 ∨ break
c  in DIMACS:
-20897 -20898  20899  755 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 5}_2 ∧ -b^{151, 5}_1 ∧ -b^{151, 5}_0 ∧ true) 
c  in CNF:
c    -b^{151, 5}_2 ∨  b^{151, 5}_1 ∨  b^{151, 5}_0 ∨ false 
c  in DIMACS:
-20897  20898  20899  0

c  3 does not represent an automaton state.
c    -(-b^{151, 5}_2 ∧  b^{151, 5}_1 ∧  b^{151, 5}_0 ∧ true) 
c  in CNF:
c     b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ false 
c  in DIMACS:
 20897 -20898 -20899  0
c  -3 does not represent an automaton state.
c    -( b^{151, 5}_2 ∧  b^{151, 5}_1 ∧  b^{151, 5}_0 ∧ true) 
c  in CNF:
c    -b^{151, 5}_2 ∨ -b^{151, 5}_1 ∨ -b^{151, 5}_0 ∨ false 
c  in DIMACS:
-20897 -20898 -20899  0

c i = 6
c  -2+1 --> -1
c    ( b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧  p_906) -> ( b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0)
c  in CNF:
c    -b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨  b^{151, 7}_2
c    -b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_1
c    -b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨  b^{151, 7}_0
c  in DIMACS:
-20900 -20901  20902 -906  20903 0
-20900 -20901  20902 -906 -20904 0
-20900 -20901  20902 -906  20905 0

c  -1+1 --> 0
c    ( b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0 ∧  p_906) -> (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧ -b^{151, 7}_0)
c  in CNF:
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_2
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_1
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_0
c  in DIMACS:
-20900  20901 -20902 -906 -20903 0
-20900  20901 -20902 -906 -20904 0
-20900  20901 -20902 -906 -20905 0

c  0+1 --> 1
c    (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧  p_906) -> (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0)
c  in CNF:
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_2
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_1
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨  b^{151, 7}_0
c  in DIMACS:
 20900  20901  20902 -906 -20903 0
 20900  20901  20902 -906 -20904 0
 20900  20901  20902 -906  20905 0

c  1+1 --> 2
c    (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0 ∧  p_906) -> (-b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0)
c  in CNF:
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_2
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨  b^{151, 7}_1
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ -p_906 ∨ -b^{151, 7}_0
c  in DIMACS:
 20900  20901 -20902 -906 -20903 0
 20900  20901 -20902 -906  20904 0
 20900  20901 -20902 -906 -20905 0

c  2+1 --> break 
c    (-b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧  p_906) -> break
c  in CNF:
c     b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 20900 -20901  20902 -906 1162 0


c  2-1 --> 1
c    (-b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧ -p_906) -> (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0)
c  in CNF:
c     b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_2
c     b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_1
c     b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨  b^{151, 7}_0
c  in DIMACS:
 20900 -20901  20902  906 -20903 0
 20900 -20901  20902  906 -20904 0
 20900 -20901  20902  906  20905 0

c  1-1 --> 0
c    (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0 ∧ -p_906) -> (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧ -b^{151, 7}_0)
c  in CNF:
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_2
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_1
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_0
c  in DIMACS:
 20900  20901 -20902  906 -20903 0
 20900  20901 -20902  906 -20904 0
 20900  20901 -20902  906 -20905 0

c  0-1 --> -1
c    (-b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧ -p_906) -> ( b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0)
c  in CNF:
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨  b^{151, 7}_2
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_1
c     b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨  b^{151, 7}_0
c  in DIMACS:
 20900  20901  20902  906  20903 0
 20900  20901  20902  906 -20904 0
 20900  20901  20902  906  20905 0

c  -1-1 --> -2
c    ( b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧  b^{151, 6}_0 ∧ -p_906) -> ( b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0)
c  in CNF:
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨  b^{151, 7}_2
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨  b^{151, 7}_1
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨  p_906 ∨ -b^{151, 7}_0
c  in DIMACS:
-20900  20901 -20902  906  20903 0
-20900  20901 -20902  906  20904 0
-20900  20901 -20902  906 -20905 0

c  -2-1 --> break 
c    ( b^{151, 6}_2 ∧  b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨  b^{151, 6}_0 ∨  p_906 ∨ break
c  in DIMACS:
-20900 -20901  20902  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 6}_2 ∧ -b^{151, 6}_1 ∧ -b^{151, 6}_0 ∧ true) 
c  in CNF:
c    -b^{151, 6}_2 ∨  b^{151, 6}_1 ∨  b^{151, 6}_0 ∨ false 
c  in DIMACS:
-20900  20901  20902  0

c  3 does not represent an automaton state.
c    -(-b^{151, 6}_2 ∧  b^{151, 6}_1 ∧  b^{151, 6}_0 ∧ true) 
c  in CNF:
c     b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ false 
c  in DIMACS:
 20900 -20901 -20902  0
c  -3 does not represent an automaton state.
c    -( b^{151, 6}_2 ∧  b^{151, 6}_1 ∧  b^{151, 6}_0 ∧ true) 
c  in CNF:
c    -b^{151, 6}_2 ∨ -b^{151, 6}_1 ∨ -b^{151, 6}_0 ∨ false 
c  in DIMACS:
-20900 -20901 -20902  0

c i = 7
c  -2+1 --> -1
c    ( b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧  p_1057) -> ( b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧  b^{151, 8}_0)
c  in CNF:
c    -b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨  b^{151, 8}_2
c    -b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_1
c    -b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨  b^{151, 8}_0
c  in DIMACS:
-20903 -20904  20905 -1057  20906 0
-20903 -20904  20905 -1057 -20907 0
-20903 -20904  20905 -1057  20908 0

c  -1+1 --> 0
c    ( b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0 ∧  p_1057) -> (-b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧ -b^{151, 8}_0)
c  in CNF:
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_2
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_1
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_0
c  in DIMACS:
-20903  20904 -20905 -1057 -20906 0
-20903  20904 -20905 -1057 -20907 0
-20903  20904 -20905 -1057 -20908 0

c  0+1 --> 1
c    (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧  p_1057) -> (-b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧  b^{151, 8}_0)
c  in CNF:
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_2
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_1
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨  b^{151, 8}_0
c  in DIMACS:
 20903  20904  20905 -1057 -20906 0
 20903  20904  20905 -1057 -20907 0
 20903  20904  20905 -1057  20908 0

c  1+1 --> 2
c    (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0 ∧  p_1057) -> (-b^{151, 8}_2 ∧  b^{151, 8}_1 ∧ -b^{151, 8}_0)
c  in CNF:
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_2
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨  b^{151, 8}_1
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ -p_1057 ∨ -b^{151, 8}_0
c  in DIMACS:
 20903  20904 -20905 -1057 -20906 0
 20903  20904 -20905 -1057  20907 0
 20903  20904 -20905 -1057 -20908 0

c  2+1 --> break 
c    (-b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧  p_1057) -> break
c  in CNF:
c     b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ -p_1057 ∨ break
c  in DIMACS:
 20903 -20904  20905 -1057 1162 0


c  2-1 --> 1
c    (-b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧ -p_1057) -> (-b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧  b^{151, 8}_0)
c  in CNF:
c     b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_2
c     b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_1
c     b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨  b^{151, 8}_0
c  in DIMACS:
 20903 -20904  20905  1057 -20906 0
 20903 -20904  20905  1057 -20907 0
 20903 -20904  20905  1057  20908 0

c  1-1 --> 0
c    (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0 ∧ -p_1057) -> (-b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧ -b^{151, 8}_0)
c  in CNF:
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_2
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_1
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_0
c  in DIMACS:
 20903  20904 -20905  1057 -20906 0
 20903  20904 -20905  1057 -20907 0
 20903  20904 -20905  1057 -20908 0

c  0-1 --> -1
c    (-b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧ -p_1057) -> ( b^{151, 8}_2 ∧ -b^{151, 8}_1 ∧  b^{151, 8}_0)
c  in CNF:
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨  b^{151, 8}_2
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_1
c     b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨  b^{151, 8}_0
c  in DIMACS:
 20903  20904  20905  1057  20906 0
 20903  20904  20905  1057 -20907 0
 20903  20904  20905  1057  20908 0

c  -1-1 --> -2
c    ( b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧  b^{151, 7}_0 ∧ -p_1057) -> ( b^{151, 8}_2 ∧  b^{151, 8}_1 ∧ -b^{151, 8}_0)
c  in CNF:
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨  b^{151, 8}_2
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨  b^{151, 8}_1
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨  p_1057 ∨ -b^{151, 8}_0
c  in DIMACS:
-20903  20904 -20905  1057  20906 0
-20903  20904 -20905  1057  20907 0
-20903  20904 -20905  1057 -20908 0

c  -2-1 --> break 
c    ( b^{151, 7}_2 ∧  b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧ -p_1057) -> break
c  in CNF:
c    -b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨  b^{151, 7}_0 ∨  p_1057 ∨ break
c  in DIMACS:
-20903 -20904  20905  1057 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{151, 7}_2 ∧ -b^{151, 7}_1 ∧ -b^{151, 7}_0 ∧ true) 
c  in CNF:
c    -b^{151, 7}_2 ∨  b^{151, 7}_1 ∨  b^{151, 7}_0 ∨ false 
c  in DIMACS:
-20903  20904  20905  0

c  3 does not represent an automaton state.
c    -(-b^{151, 7}_2 ∧  b^{151, 7}_1 ∧  b^{151, 7}_0 ∧ true) 
c  in CNF:
c     b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ false 
c  in DIMACS:
 20903 -20904 -20905  0
c  -3 does not represent an automaton state.
c    -( b^{151, 7}_2 ∧  b^{151, 7}_1 ∧  b^{151, 7}_0 ∧ true) 
c  in CNF:
c    -b^{151, 7}_2 ∨ -b^{151, 7}_1 ∨ -b^{151, 7}_0 ∨ false 
c  in DIMACS:
-20903 -20904 -20905  0

c INIT for k = 152
c    -b^{152, 1}_2
c    -b^{152, 1}_1
c    -b^{152, 1}_0
c  in DIMACS:
-20909 0
-20910 0
-20911 0

c Transitions for k = 152
c i = 1
c  -2+1 --> -1
c    ( b^{152, 1}_2 ∧  b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧  p_152) -> ( b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0)
c  in CNF:
c    -b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨  b^{152, 2}_2
c    -b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_1
c    -b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨  b^{152, 2}_0
c  in DIMACS:
-20909 -20910  20911 -152  20912 0
-20909 -20910  20911 -152 -20913 0
-20909 -20910  20911 -152  20914 0

c  -1+1 --> 0
c    ( b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧  b^{152, 1}_0 ∧  p_152) -> (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧ -b^{152, 2}_0)
c  in CNF:
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_2
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_1
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_0
c  in DIMACS:
-20909  20910 -20911 -152 -20912 0
-20909  20910 -20911 -152 -20913 0
-20909  20910 -20911 -152 -20914 0

c  0+1 --> 1
c    (-b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧  p_152) -> (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0)
c  in CNF:
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_2
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_1
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨  b^{152, 2}_0
c  in DIMACS:
 20909  20910  20911 -152 -20912 0
 20909  20910  20911 -152 -20913 0
 20909  20910  20911 -152  20914 0

c  1+1 --> 2
c    (-b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧  b^{152, 1}_0 ∧  p_152) -> (-b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0)
c  in CNF:
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_2
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨  b^{152, 2}_1
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ -p_152 ∨ -b^{152, 2}_0
c  in DIMACS:
 20909  20910 -20911 -152 -20912 0
 20909  20910 -20911 -152  20913 0
 20909  20910 -20911 -152 -20914 0

c  2+1 --> break 
c    (-b^{152, 1}_2 ∧  b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧  p_152) -> break
c  in CNF:
c     b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ -p_152 ∨ break
c  in DIMACS:
 20909 -20910  20911 -152 1162 0


c  2-1 --> 1
c    (-b^{152, 1}_2 ∧  b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧ -p_152) -> (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0)
c  in CNF:
c     b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_2
c     b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_1
c     b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨  b^{152, 2}_0
c  in DIMACS:
 20909 -20910  20911  152 -20912 0
 20909 -20910  20911  152 -20913 0
 20909 -20910  20911  152  20914 0

c  1-1 --> 0
c    (-b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧  b^{152, 1}_0 ∧ -p_152) -> (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧ -b^{152, 2}_0)
c  in CNF:
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_2
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_1
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_0
c  in DIMACS:
 20909  20910 -20911  152 -20912 0
 20909  20910 -20911  152 -20913 0
 20909  20910 -20911  152 -20914 0

c  0-1 --> -1
c    (-b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧ -p_152) -> ( b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0)
c  in CNF:
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨  b^{152, 2}_2
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_1
c     b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨  b^{152, 2}_0
c  in DIMACS:
 20909  20910  20911  152  20912 0
 20909  20910  20911  152 -20913 0
 20909  20910  20911  152  20914 0

c  -1-1 --> -2
c    ( b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧  b^{152, 1}_0 ∧ -p_152) -> ( b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0)
c  in CNF:
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨  b^{152, 2}_2
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨  b^{152, 2}_1
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨  p_152 ∨ -b^{152, 2}_0
c  in DIMACS:
-20909  20910 -20911  152  20912 0
-20909  20910 -20911  152  20913 0
-20909  20910 -20911  152 -20914 0

c  -2-1 --> break 
c    ( b^{152, 1}_2 ∧  b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧ -p_152) -> break
c  in CNF:
c    -b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨  b^{152, 1}_0 ∨  p_152 ∨ break
c  in DIMACS:
-20909 -20910  20911  152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 1}_2 ∧ -b^{152, 1}_1 ∧ -b^{152, 1}_0 ∧ true) 
c  in CNF:
c    -b^{152, 1}_2 ∨  b^{152, 1}_1 ∨  b^{152, 1}_0 ∨ false 
c  in DIMACS:
-20909  20910  20911  0

c  3 does not represent an automaton state.
c    -(-b^{152, 1}_2 ∧  b^{152, 1}_1 ∧  b^{152, 1}_0 ∧ true) 
c  in CNF:
c     b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ false 
c  in DIMACS:
 20909 -20910 -20911  0
c  -3 does not represent an automaton state.
c    -( b^{152, 1}_2 ∧  b^{152, 1}_1 ∧  b^{152, 1}_0 ∧ true) 
c  in CNF:
c    -b^{152, 1}_2 ∨ -b^{152, 1}_1 ∨ -b^{152, 1}_0 ∨ false 
c  in DIMACS:
-20909 -20910 -20911  0

c i = 2
c  -2+1 --> -1
c    ( b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧  p_304) -> ( b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0)
c  in CNF:
c    -b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨  b^{152, 3}_2
c    -b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_1
c    -b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨  b^{152, 3}_0
c  in DIMACS:
-20912 -20913  20914 -304  20915 0
-20912 -20913  20914 -304 -20916 0
-20912 -20913  20914 -304  20917 0

c  -1+1 --> 0
c    ( b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0 ∧  p_304) -> (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧ -b^{152, 3}_0)
c  in CNF:
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_2
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_1
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_0
c  in DIMACS:
-20912  20913 -20914 -304 -20915 0
-20912  20913 -20914 -304 -20916 0
-20912  20913 -20914 -304 -20917 0

c  0+1 --> 1
c    (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧  p_304) -> (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0)
c  in CNF:
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_2
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_1
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨  b^{152, 3}_0
c  in DIMACS:
 20912  20913  20914 -304 -20915 0
 20912  20913  20914 -304 -20916 0
 20912  20913  20914 -304  20917 0

c  1+1 --> 2
c    (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0 ∧  p_304) -> (-b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0)
c  in CNF:
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_2
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨  b^{152, 3}_1
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ -p_304 ∨ -b^{152, 3}_0
c  in DIMACS:
 20912  20913 -20914 -304 -20915 0
 20912  20913 -20914 -304  20916 0
 20912  20913 -20914 -304 -20917 0

c  2+1 --> break 
c    (-b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧  p_304) -> break
c  in CNF:
c     b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 20912 -20913  20914 -304 1162 0


c  2-1 --> 1
c    (-b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧ -p_304) -> (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0)
c  in CNF:
c     b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_2
c     b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_1
c     b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨  b^{152, 3}_0
c  in DIMACS:
 20912 -20913  20914  304 -20915 0
 20912 -20913  20914  304 -20916 0
 20912 -20913  20914  304  20917 0

c  1-1 --> 0
c    (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0 ∧ -p_304) -> (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧ -b^{152, 3}_0)
c  in CNF:
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_2
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_1
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_0
c  in DIMACS:
 20912  20913 -20914  304 -20915 0
 20912  20913 -20914  304 -20916 0
 20912  20913 -20914  304 -20917 0

c  0-1 --> -1
c    (-b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧ -p_304) -> ( b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0)
c  in CNF:
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨  b^{152, 3}_2
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_1
c     b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨  b^{152, 3}_0
c  in DIMACS:
 20912  20913  20914  304  20915 0
 20912  20913  20914  304 -20916 0
 20912  20913  20914  304  20917 0

c  -1-1 --> -2
c    ( b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧  b^{152, 2}_0 ∧ -p_304) -> ( b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0)
c  in CNF:
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨  b^{152, 3}_2
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨  b^{152, 3}_1
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨  p_304 ∨ -b^{152, 3}_0
c  in DIMACS:
-20912  20913 -20914  304  20915 0
-20912  20913 -20914  304  20916 0
-20912  20913 -20914  304 -20917 0

c  -2-1 --> break 
c    ( b^{152, 2}_2 ∧  b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨  b^{152, 2}_0 ∨  p_304 ∨ break
c  in DIMACS:
-20912 -20913  20914  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 2}_2 ∧ -b^{152, 2}_1 ∧ -b^{152, 2}_0 ∧ true) 
c  in CNF:
c    -b^{152, 2}_2 ∨  b^{152, 2}_1 ∨  b^{152, 2}_0 ∨ false 
c  in DIMACS:
-20912  20913  20914  0

c  3 does not represent an automaton state.
c    -(-b^{152, 2}_2 ∧  b^{152, 2}_1 ∧  b^{152, 2}_0 ∧ true) 
c  in CNF:
c     b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ false 
c  in DIMACS:
 20912 -20913 -20914  0
c  -3 does not represent an automaton state.
c    -( b^{152, 2}_2 ∧  b^{152, 2}_1 ∧  b^{152, 2}_0 ∧ true) 
c  in CNF:
c    -b^{152, 2}_2 ∨ -b^{152, 2}_1 ∨ -b^{152, 2}_0 ∨ false 
c  in DIMACS:
-20912 -20913 -20914  0

c i = 3
c  -2+1 --> -1
c    ( b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧  p_456) -> ( b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0)
c  in CNF:
c    -b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨  b^{152, 4}_2
c    -b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_1
c    -b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨  b^{152, 4}_0
c  in DIMACS:
-20915 -20916  20917 -456  20918 0
-20915 -20916  20917 -456 -20919 0
-20915 -20916  20917 -456  20920 0

c  -1+1 --> 0
c    ( b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0 ∧  p_456) -> (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧ -b^{152, 4}_0)
c  in CNF:
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_2
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_1
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_0
c  in DIMACS:
-20915  20916 -20917 -456 -20918 0
-20915  20916 -20917 -456 -20919 0
-20915  20916 -20917 -456 -20920 0

c  0+1 --> 1
c    (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧  p_456) -> (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0)
c  in CNF:
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_2
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_1
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨  b^{152, 4}_0
c  in DIMACS:
 20915  20916  20917 -456 -20918 0
 20915  20916  20917 -456 -20919 0
 20915  20916  20917 -456  20920 0

c  1+1 --> 2
c    (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0 ∧  p_456) -> (-b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0)
c  in CNF:
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_2
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨  b^{152, 4}_1
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ -p_456 ∨ -b^{152, 4}_0
c  in DIMACS:
 20915  20916 -20917 -456 -20918 0
 20915  20916 -20917 -456  20919 0
 20915  20916 -20917 -456 -20920 0

c  2+1 --> break 
c    (-b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧  p_456) -> break
c  in CNF:
c     b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 20915 -20916  20917 -456 1162 0


c  2-1 --> 1
c    (-b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧ -p_456) -> (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0)
c  in CNF:
c     b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_2
c     b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_1
c     b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨  b^{152, 4}_0
c  in DIMACS:
 20915 -20916  20917  456 -20918 0
 20915 -20916  20917  456 -20919 0
 20915 -20916  20917  456  20920 0

c  1-1 --> 0
c    (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0 ∧ -p_456) -> (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧ -b^{152, 4}_0)
c  in CNF:
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_2
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_1
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_0
c  in DIMACS:
 20915  20916 -20917  456 -20918 0
 20915  20916 -20917  456 -20919 0
 20915  20916 -20917  456 -20920 0

c  0-1 --> -1
c    (-b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧ -p_456) -> ( b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0)
c  in CNF:
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨  b^{152, 4}_2
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_1
c     b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨  b^{152, 4}_0
c  in DIMACS:
 20915  20916  20917  456  20918 0
 20915  20916  20917  456 -20919 0
 20915  20916  20917  456  20920 0

c  -1-1 --> -2
c    ( b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧  b^{152, 3}_0 ∧ -p_456) -> ( b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0)
c  in CNF:
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨  b^{152, 4}_2
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨  b^{152, 4}_1
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨  p_456 ∨ -b^{152, 4}_0
c  in DIMACS:
-20915  20916 -20917  456  20918 0
-20915  20916 -20917  456  20919 0
-20915  20916 -20917  456 -20920 0

c  -2-1 --> break 
c    ( b^{152, 3}_2 ∧  b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨  b^{152, 3}_0 ∨  p_456 ∨ break
c  in DIMACS:
-20915 -20916  20917  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 3}_2 ∧ -b^{152, 3}_1 ∧ -b^{152, 3}_0 ∧ true) 
c  in CNF:
c    -b^{152, 3}_2 ∨  b^{152, 3}_1 ∨  b^{152, 3}_0 ∨ false 
c  in DIMACS:
-20915  20916  20917  0

c  3 does not represent an automaton state.
c    -(-b^{152, 3}_2 ∧  b^{152, 3}_1 ∧  b^{152, 3}_0 ∧ true) 
c  in CNF:
c     b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ false 
c  in DIMACS:
 20915 -20916 -20917  0
c  -3 does not represent an automaton state.
c    -( b^{152, 3}_2 ∧  b^{152, 3}_1 ∧  b^{152, 3}_0 ∧ true) 
c  in CNF:
c    -b^{152, 3}_2 ∨ -b^{152, 3}_1 ∨ -b^{152, 3}_0 ∨ false 
c  in DIMACS:
-20915 -20916 -20917  0

c i = 4
c  -2+1 --> -1
c    ( b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧  p_608) -> ( b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0)
c  in CNF:
c    -b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨  b^{152, 5}_2
c    -b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_1
c    -b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨  b^{152, 5}_0
c  in DIMACS:
-20918 -20919  20920 -608  20921 0
-20918 -20919  20920 -608 -20922 0
-20918 -20919  20920 -608  20923 0

c  -1+1 --> 0
c    ( b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0 ∧  p_608) -> (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧ -b^{152, 5}_0)
c  in CNF:
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_2
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_1
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_0
c  in DIMACS:
-20918  20919 -20920 -608 -20921 0
-20918  20919 -20920 -608 -20922 0
-20918  20919 -20920 -608 -20923 0

c  0+1 --> 1
c    (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧  p_608) -> (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0)
c  in CNF:
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_2
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_1
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨  b^{152, 5}_0
c  in DIMACS:
 20918  20919  20920 -608 -20921 0
 20918  20919  20920 -608 -20922 0
 20918  20919  20920 -608  20923 0

c  1+1 --> 2
c    (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0 ∧  p_608) -> (-b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0)
c  in CNF:
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_2
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨  b^{152, 5}_1
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ -p_608 ∨ -b^{152, 5}_0
c  in DIMACS:
 20918  20919 -20920 -608 -20921 0
 20918  20919 -20920 -608  20922 0
 20918  20919 -20920 -608 -20923 0

c  2+1 --> break 
c    (-b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧  p_608) -> break
c  in CNF:
c     b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 20918 -20919  20920 -608 1162 0


c  2-1 --> 1
c    (-b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧ -p_608) -> (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0)
c  in CNF:
c     b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_2
c     b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_1
c     b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨  b^{152, 5}_0
c  in DIMACS:
 20918 -20919  20920  608 -20921 0
 20918 -20919  20920  608 -20922 0
 20918 -20919  20920  608  20923 0

c  1-1 --> 0
c    (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0 ∧ -p_608) -> (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧ -b^{152, 5}_0)
c  in CNF:
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_2
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_1
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_0
c  in DIMACS:
 20918  20919 -20920  608 -20921 0
 20918  20919 -20920  608 -20922 0
 20918  20919 -20920  608 -20923 0

c  0-1 --> -1
c    (-b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧ -p_608) -> ( b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0)
c  in CNF:
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨  b^{152, 5}_2
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_1
c     b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨  b^{152, 5}_0
c  in DIMACS:
 20918  20919  20920  608  20921 0
 20918  20919  20920  608 -20922 0
 20918  20919  20920  608  20923 0

c  -1-1 --> -2
c    ( b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧  b^{152, 4}_0 ∧ -p_608) -> ( b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0)
c  in CNF:
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨  b^{152, 5}_2
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨  b^{152, 5}_1
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨  p_608 ∨ -b^{152, 5}_0
c  in DIMACS:
-20918  20919 -20920  608  20921 0
-20918  20919 -20920  608  20922 0
-20918  20919 -20920  608 -20923 0

c  -2-1 --> break 
c    ( b^{152, 4}_2 ∧  b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨  b^{152, 4}_0 ∨  p_608 ∨ break
c  in DIMACS:
-20918 -20919  20920  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 4}_2 ∧ -b^{152, 4}_1 ∧ -b^{152, 4}_0 ∧ true) 
c  in CNF:
c    -b^{152, 4}_2 ∨  b^{152, 4}_1 ∨  b^{152, 4}_0 ∨ false 
c  in DIMACS:
-20918  20919  20920  0

c  3 does not represent an automaton state.
c    -(-b^{152, 4}_2 ∧  b^{152, 4}_1 ∧  b^{152, 4}_0 ∧ true) 
c  in CNF:
c     b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ false 
c  in DIMACS:
 20918 -20919 -20920  0
c  -3 does not represent an automaton state.
c    -( b^{152, 4}_2 ∧  b^{152, 4}_1 ∧  b^{152, 4}_0 ∧ true) 
c  in CNF:
c    -b^{152, 4}_2 ∨ -b^{152, 4}_1 ∨ -b^{152, 4}_0 ∨ false 
c  in DIMACS:
-20918 -20919 -20920  0

c i = 5
c  -2+1 --> -1
c    ( b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧  p_760) -> ( b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0)
c  in CNF:
c    -b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨  b^{152, 6}_2
c    -b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_1
c    -b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨  b^{152, 6}_0
c  in DIMACS:
-20921 -20922  20923 -760  20924 0
-20921 -20922  20923 -760 -20925 0
-20921 -20922  20923 -760  20926 0

c  -1+1 --> 0
c    ( b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0 ∧  p_760) -> (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧ -b^{152, 6}_0)
c  in CNF:
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_2
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_1
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_0
c  in DIMACS:
-20921  20922 -20923 -760 -20924 0
-20921  20922 -20923 -760 -20925 0
-20921  20922 -20923 -760 -20926 0

c  0+1 --> 1
c    (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧  p_760) -> (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0)
c  in CNF:
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_2
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_1
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨  b^{152, 6}_0
c  in DIMACS:
 20921  20922  20923 -760 -20924 0
 20921  20922  20923 -760 -20925 0
 20921  20922  20923 -760  20926 0

c  1+1 --> 2
c    (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0 ∧  p_760) -> (-b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0)
c  in CNF:
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_2
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨  b^{152, 6}_1
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ -p_760 ∨ -b^{152, 6}_0
c  in DIMACS:
 20921  20922 -20923 -760 -20924 0
 20921  20922 -20923 -760  20925 0
 20921  20922 -20923 -760 -20926 0

c  2+1 --> break 
c    (-b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧  p_760) -> break
c  in CNF:
c     b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 20921 -20922  20923 -760 1162 0


c  2-1 --> 1
c    (-b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧ -p_760) -> (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0)
c  in CNF:
c     b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_2
c     b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_1
c     b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨  b^{152, 6}_0
c  in DIMACS:
 20921 -20922  20923  760 -20924 0
 20921 -20922  20923  760 -20925 0
 20921 -20922  20923  760  20926 0

c  1-1 --> 0
c    (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0 ∧ -p_760) -> (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧ -b^{152, 6}_0)
c  in CNF:
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_2
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_1
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_0
c  in DIMACS:
 20921  20922 -20923  760 -20924 0
 20921  20922 -20923  760 -20925 0
 20921  20922 -20923  760 -20926 0

c  0-1 --> -1
c    (-b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧ -p_760) -> ( b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0)
c  in CNF:
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨  b^{152, 6}_2
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_1
c     b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨  b^{152, 6}_0
c  in DIMACS:
 20921  20922  20923  760  20924 0
 20921  20922  20923  760 -20925 0
 20921  20922  20923  760  20926 0

c  -1-1 --> -2
c    ( b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧  b^{152, 5}_0 ∧ -p_760) -> ( b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0)
c  in CNF:
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨  b^{152, 6}_2
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨  b^{152, 6}_1
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨  p_760 ∨ -b^{152, 6}_0
c  in DIMACS:
-20921  20922 -20923  760  20924 0
-20921  20922 -20923  760  20925 0
-20921  20922 -20923  760 -20926 0

c  -2-1 --> break 
c    ( b^{152, 5}_2 ∧  b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨  b^{152, 5}_0 ∨  p_760 ∨ break
c  in DIMACS:
-20921 -20922  20923  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 5}_2 ∧ -b^{152, 5}_1 ∧ -b^{152, 5}_0 ∧ true) 
c  in CNF:
c    -b^{152, 5}_2 ∨  b^{152, 5}_1 ∨  b^{152, 5}_0 ∨ false 
c  in DIMACS:
-20921  20922  20923  0

c  3 does not represent an automaton state.
c    -(-b^{152, 5}_2 ∧  b^{152, 5}_1 ∧  b^{152, 5}_0 ∧ true) 
c  in CNF:
c     b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ false 
c  in DIMACS:
 20921 -20922 -20923  0
c  -3 does not represent an automaton state.
c    -( b^{152, 5}_2 ∧  b^{152, 5}_1 ∧  b^{152, 5}_0 ∧ true) 
c  in CNF:
c    -b^{152, 5}_2 ∨ -b^{152, 5}_1 ∨ -b^{152, 5}_0 ∨ false 
c  in DIMACS:
-20921 -20922 -20923  0

c i = 6
c  -2+1 --> -1
c    ( b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧  p_912) -> ( b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0)
c  in CNF:
c    -b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨  b^{152, 7}_2
c    -b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_1
c    -b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨  b^{152, 7}_0
c  in DIMACS:
-20924 -20925  20926 -912  20927 0
-20924 -20925  20926 -912 -20928 0
-20924 -20925  20926 -912  20929 0

c  -1+1 --> 0
c    ( b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0 ∧  p_912) -> (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧ -b^{152, 7}_0)
c  in CNF:
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_2
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_1
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_0
c  in DIMACS:
-20924  20925 -20926 -912 -20927 0
-20924  20925 -20926 -912 -20928 0
-20924  20925 -20926 -912 -20929 0

c  0+1 --> 1
c    (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧  p_912) -> (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0)
c  in CNF:
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_2
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_1
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨  b^{152, 7}_0
c  in DIMACS:
 20924  20925  20926 -912 -20927 0
 20924  20925  20926 -912 -20928 0
 20924  20925  20926 -912  20929 0

c  1+1 --> 2
c    (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0 ∧  p_912) -> (-b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0)
c  in CNF:
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_2
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨  b^{152, 7}_1
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ -p_912 ∨ -b^{152, 7}_0
c  in DIMACS:
 20924  20925 -20926 -912 -20927 0
 20924  20925 -20926 -912  20928 0
 20924  20925 -20926 -912 -20929 0

c  2+1 --> break 
c    (-b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧  p_912) -> break
c  in CNF:
c     b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 20924 -20925  20926 -912 1162 0


c  2-1 --> 1
c    (-b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧ -p_912) -> (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0)
c  in CNF:
c     b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_2
c     b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_1
c     b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨  b^{152, 7}_0
c  in DIMACS:
 20924 -20925  20926  912 -20927 0
 20924 -20925  20926  912 -20928 0
 20924 -20925  20926  912  20929 0

c  1-1 --> 0
c    (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0 ∧ -p_912) -> (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧ -b^{152, 7}_0)
c  in CNF:
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_2
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_1
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_0
c  in DIMACS:
 20924  20925 -20926  912 -20927 0
 20924  20925 -20926  912 -20928 0
 20924  20925 -20926  912 -20929 0

c  0-1 --> -1
c    (-b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧ -p_912) -> ( b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0)
c  in CNF:
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨  b^{152, 7}_2
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_1
c     b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨  b^{152, 7}_0
c  in DIMACS:
 20924  20925  20926  912  20927 0
 20924  20925  20926  912 -20928 0
 20924  20925  20926  912  20929 0

c  -1-1 --> -2
c    ( b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧  b^{152, 6}_0 ∧ -p_912) -> ( b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0)
c  in CNF:
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨  b^{152, 7}_2
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨  b^{152, 7}_1
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨  p_912 ∨ -b^{152, 7}_0
c  in DIMACS:
-20924  20925 -20926  912  20927 0
-20924  20925 -20926  912  20928 0
-20924  20925 -20926  912 -20929 0

c  -2-1 --> break 
c    ( b^{152, 6}_2 ∧  b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨  b^{152, 6}_0 ∨  p_912 ∨ break
c  in DIMACS:
-20924 -20925  20926  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 6}_2 ∧ -b^{152, 6}_1 ∧ -b^{152, 6}_0 ∧ true) 
c  in CNF:
c    -b^{152, 6}_2 ∨  b^{152, 6}_1 ∨  b^{152, 6}_0 ∨ false 
c  in DIMACS:
-20924  20925  20926  0

c  3 does not represent an automaton state.
c    -(-b^{152, 6}_2 ∧  b^{152, 6}_1 ∧  b^{152, 6}_0 ∧ true) 
c  in CNF:
c     b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ false 
c  in DIMACS:
 20924 -20925 -20926  0
c  -3 does not represent an automaton state.
c    -( b^{152, 6}_2 ∧  b^{152, 6}_1 ∧  b^{152, 6}_0 ∧ true) 
c  in CNF:
c    -b^{152, 6}_2 ∨ -b^{152, 6}_1 ∨ -b^{152, 6}_0 ∨ false 
c  in DIMACS:
-20924 -20925 -20926  0

c i = 7
c  -2+1 --> -1
c    ( b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧  p_1064) -> ( b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧  b^{152, 8}_0)
c  in CNF:
c    -b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨  b^{152, 8}_2
c    -b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_1
c    -b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨  b^{152, 8}_0
c  in DIMACS:
-20927 -20928  20929 -1064  20930 0
-20927 -20928  20929 -1064 -20931 0
-20927 -20928  20929 -1064  20932 0

c  -1+1 --> 0
c    ( b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0 ∧  p_1064) -> (-b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧ -b^{152, 8}_0)
c  in CNF:
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_2
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_1
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_0
c  in DIMACS:
-20927  20928 -20929 -1064 -20930 0
-20927  20928 -20929 -1064 -20931 0
-20927  20928 -20929 -1064 -20932 0

c  0+1 --> 1
c    (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧  p_1064) -> (-b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧  b^{152, 8}_0)
c  in CNF:
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_2
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_1
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨  b^{152, 8}_0
c  in DIMACS:
 20927  20928  20929 -1064 -20930 0
 20927  20928  20929 -1064 -20931 0
 20927  20928  20929 -1064  20932 0

c  1+1 --> 2
c    (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0 ∧  p_1064) -> (-b^{152, 8}_2 ∧  b^{152, 8}_1 ∧ -b^{152, 8}_0)
c  in CNF:
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_2
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨  b^{152, 8}_1
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ -p_1064 ∨ -b^{152, 8}_0
c  in DIMACS:
 20927  20928 -20929 -1064 -20930 0
 20927  20928 -20929 -1064  20931 0
 20927  20928 -20929 -1064 -20932 0

c  2+1 --> break 
c    (-b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 20927 -20928  20929 -1064 1162 0


c  2-1 --> 1
c    (-b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧ -p_1064) -> (-b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧  b^{152, 8}_0)
c  in CNF:
c     b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_2
c     b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_1
c     b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨  b^{152, 8}_0
c  in DIMACS:
 20927 -20928  20929  1064 -20930 0
 20927 -20928  20929  1064 -20931 0
 20927 -20928  20929  1064  20932 0

c  1-1 --> 0
c    (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0 ∧ -p_1064) -> (-b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧ -b^{152, 8}_0)
c  in CNF:
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_2
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_1
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_0
c  in DIMACS:
 20927  20928 -20929  1064 -20930 0
 20927  20928 -20929  1064 -20931 0
 20927  20928 -20929  1064 -20932 0

c  0-1 --> -1
c    (-b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧ -p_1064) -> ( b^{152, 8}_2 ∧ -b^{152, 8}_1 ∧  b^{152, 8}_0)
c  in CNF:
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨  b^{152, 8}_2
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_1
c     b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨  b^{152, 8}_0
c  in DIMACS:
 20927  20928  20929  1064  20930 0
 20927  20928  20929  1064 -20931 0
 20927  20928  20929  1064  20932 0

c  -1-1 --> -2
c    ( b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧  b^{152, 7}_0 ∧ -p_1064) -> ( b^{152, 8}_2 ∧  b^{152, 8}_1 ∧ -b^{152, 8}_0)
c  in CNF:
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨  b^{152, 8}_2
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨  b^{152, 8}_1
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨  p_1064 ∨ -b^{152, 8}_0
c  in DIMACS:
-20927  20928 -20929  1064  20930 0
-20927  20928 -20929  1064  20931 0
-20927  20928 -20929  1064 -20932 0

c  -2-1 --> break 
c    ( b^{152, 7}_2 ∧  b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨  b^{152, 7}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-20927 -20928  20929  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{152, 7}_2 ∧ -b^{152, 7}_1 ∧ -b^{152, 7}_0 ∧ true) 
c  in CNF:
c    -b^{152, 7}_2 ∨  b^{152, 7}_1 ∨  b^{152, 7}_0 ∨ false 
c  in DIMACS:
-20927  20928  20929  0

c  3 does not represent an automaton state.
c    -(-b^{152, 7}_2 ∧  b^{152, 7}_1 ∧  b^{152, 7}_0 ∧ true) 
c  in CNF:
c     b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ false 
c  in DIMACS:
 20927 -20928 -20929  0
c  -3 does not represent an automaton state.
c    -( b^{152, 7}_2 ∧  b^{152, 7}_1 ∧  b^{152, 7}_0 ∧ true) 
c  in CNF:
c    -b^{152, 7}_2 ∨ -b^{152, 7}_1 ∨ -b^{152, 7}_0 ∨ false 
c  in DIMACS:
-20927 -20928 -20929  0

c INIT for k = 153
c    -b^{153, 1}_2
c    -b^{153, 1}_1
c    -b^{153, 1}_0
c  in DIMACS:
-20933 0
-20934 0
-20935 0

c Transitions for k = 153
c i = 1
c  -2+1 --> -1
c    ( b^{153, 1}_2 ∧  b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧  p_153) -> ( b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0)
c  in CNF:
c    -b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨  b^{153, 2}_2
c    -b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_1
c    -b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨  b^{153, 2}_0
c  in DIMACS:
-20933 -20934  20935 -153  20936 0
-20933 -20934  20935 -153 -20937 0
-20933 -20934  20935 -153  20938 0

c  -1+1 --> 0
c    ( b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧  b^{153, 1}_0 ∧  p_153) -> (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧ -b^{153, 2}_0)
c  in CNF:
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_2
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_1
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_0
c  in DIMACS:
-20933  20934 -20935 -153 -20936 0
-20933  20934 -20935 -153 -20937 0
-20933  20934 -20935 -153 -20938 0

c  0+1 --> 1
c    (-b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧  p_153) -> (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0)
c  in CNF:
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_2
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_1
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨  b^{153, 2}_0
c  in DIMACS:
 20933  20934  20935 -153 -20936 0
 20933  20934  20935 -153 -20937 0
 20933  20934  20935 -153  20938 0

c  1+1 --> 2
c    (-b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧  b^{153, 1}_0 ∧  p_153) -> (-b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0)
c  in CNF:
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_2
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨  b^{153, 2}_1
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ -p_153 ∨ -b^{153, 2}_0
c  in DIMACS:
 20933  20934 -20935 -153 -20936 0
 20933  20934 -20935 -153  20937 0
 20933  20934 -20935 -153 -20938 0

c  2+1 --> break 
c    (-b^{153, 1}_2 ∧  b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧  p_153) -> break
c  in CNF:
c     b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ -p_153 ∨ break
c  in DIMACS:
 20933 -20934  20935 -153 1162 0


c  2-1 --> 1
c    (-b^{153, 1}_2 ∧  b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧ -p_153) -> (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0)
c  in CNF:
c     b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_2
c     b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_1
c     b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨  b^{153, 2}_0
c  in DIMACS:
 20933 -20934  20935  153 -20936 0
 20933 -20934  20935  153 -20937 0
 20933 -20934  20935  153  20938 0

c  1-1 --> 0
c    (-b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧  b^{153, 1}_0 ∧ -p_153) -> (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧ -b^{153, 2}_0)
c  in CNF:
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_2
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_1
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_0
c  in DIMACS:
 20933  20934 -20935  153 -20936 0
 20933  20934 -20935  153 -20937 0
 20933  20934 -20935  153 -20938 0

c  0-1 --> -1
c    (-b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧ -p_153) -> ( b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0)
c  in CNF:
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨  b^{153, 2}_2
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_1
c     b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨  b^{153, 2}_0
c  in DIMACS:
 20933  20934  20935  153  20936 0
 20933  20934  20935  153 -20937 0
 20933  20934  20935  153  20938 0

c  -1-1 --> -2
c    ( b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧  b^{153, 1}_0 ∧ -p_153) -> ( b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0)
c  in CNF:
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨  b^{153, 2}_2
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨  b^{153, 2}_1
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨  p_153 ∨ -b^{153, 2}_0
c  in DIMACS:
-20933  20934 -20935  153  20936 0
-20933  20934 -20935  153  20937 0
-20933  20934 -20935  153 -20938 0

c  -2-1 --> break 
c    ( b^{153, 1}_2 ∧  b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧ -p_153) -> break
c  in CNF:
c    -b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨  b^{153, 1}_0 ∨  p_153 ∨ break
c  in DIMACS:
-20933 -20934  20935  153 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 1}_2 ∧ -b^{153, 1}_1 ∧ -b^{153, 1}_0 ∧ true) 
c  in CNF:
c    -b^{153, 1}_2 ∨  b^{153, 1}_1 ∨  b^{153, 1}_0 ∨ false 
c  in DIMACS:
-20933  20934  20935  0

c  3 does not represent an automaton state.
c    -(-b^{153, 1}_2 ∧  b^{153, 1}_1 ∧  b^{153, 1}_0 ∧ true) 
c  in CNF:
c     b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ false 
c  in DIMACS:
 20933 -20934 -20935  0
c  -3 does not represent an automaton state.
c    -( b^{153, 1}_2 ∧  b^{153, 1}_1 ∧  b^{153, 1}_0 ∧ true) 
c  in CNF:
c    -b^{153, 1}_2 ∨ -b^{153, 1}_1 ∨ -b^{153, 1}_0 ∨ false 
c  in DIMACS:
-20933 -20934 -20935  0

c i = 2
c  -2+1 --> -1
c    ( b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧  p_306) -> ( b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0)
c  in CNF:
c    -b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨  b^{153, 3}_2
c    -b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_1
c    -b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨  b^{153, 3}_0
c  in DIMACS:
-20936 -20937  20938 -306  20939 0
-20936 -20937  20938 -306 -20940 0
-20936 -20937  20938 -306  20941 0

c  -1+1 --> 0
c    ( b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0 ∧  p_306) -> (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧ -b^{153, 3}_0)
c  in CNF:
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_2
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_1
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_0
c  in DIMACS:
-20936  20937 -20938 -306 -20939 0
-20936  20937 -20938 -306 -20940 0
-20936  20937 -20938 -306 -20941 0

c  0+1 --> 1
c    (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧  p_306) -> (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0)
c  in CNF:
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_2
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_1
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨  b^{153, 3}_0
c  in DIMACS:
 20936  20937  20938 -306 -20939 0
 20936  20937  20938 -306 -20940 0
 20936  20937  20938 -306  20941 0

c  1+1 --> 2
c    (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0 ∧  p_306) -> (-b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0)
c  in CNF:
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_2
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨  b^{153, 3}_1
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ -p_306 ∨ -b^{153, 3}_0
c  in DIMACS:
 20936  20937 -20938 -306 -20939 0
 20936  20937 -20938 -306  20940 0
 20936  20937 -20938 -306 -20941 0

c  2+1 --> break 
c    (-b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧  p_306) -> break
c  in CNF:
c     b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 20936 -20937  20938 -306 1162 0


c  2-1 --> 1
c    (-b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧ -p_306) -> (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0)
c  in CNF:
c     b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_2
c     b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_1
c     b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨  b^{153, 3}_0
c  in DIMACS:
 20936 -20937  20938  306 -20939 0
 20936 -20937  20938  306 -20940 0
 20936 -20937  20938  306  20941 0

c  1-1 --> 0
c    (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0 ∧ -p_306) -> (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧ -b^{153, 3}_0)
c  in CNF:
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_2
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_1
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_0
c  in DIMACS:
 20936  20937 -20938  306 -20939 0
 20936  20937 -20938  306 -20940 0
 20936  20937 -20938  306 -20941 0

c  0-1 --> -1
c    (-b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧ -p_306) -> ( b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0)
c  in CNF:
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨  b^{153, 3}_2
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_1
c     b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨  b^{153, 3}_0
c  in DIMACS:
 20936  20937  20938  306  20939 0
 20936  20937  20938  306 -20940 0
 20936  20937  20938  306  20941 0

c  -1-1 --> -2
c    ( b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧  b^{153, 2}_0 ∧ -p_306) -> ( b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0)
c  in CNF:
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨  b^{153, 3}_2
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨  b^{153, 3}_1
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨  p_306 ∨ -b^{153, 3}_0
c  in DIMACS:
-20936  20937 -20938  306  20939 0
-20936  20937 -20938  306  20940 0
-20936  20937 -20938  306 -20941 0

c  -2-1 --> break 
c    ( b^{153, 2}_2 ∧  b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨  b^{153, 2}_0 ∨  p_306 ∨ break
c  in DIMACS:
-20936 -20937  20938  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 2}_2 ∧ -b^{153, 2}_1 ∧ -b^{153, 2}_0 ∧ true) 
c  in CNF:
c    -b^{153, 2}_2 ∨  b^{153, 2}_1 ∨  b^{153, 2}_0 ∨ false 
c  in DIMACS:
-20936  20937  20938  0

c  3 does not represent an automaton state.
c    -(-b^{153, 2}_2 ∧  b^{153, 2}_1 ∧  b^{153, 2}_0 ∧ true) 
c  in CNF:
c     b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ false 
c  in DIMACS:
 20936 -20937 -20938  0
c  -3 does not represent an automaton state.
c    -( b^{153, 2}_2 ∧  b^{153, 2}_1 ∧  b^{153, 2}_0 ∧ true) 
c  in CNF:
c    -b^{153, 2}_2 ∨ -b^{153, 2}_1 ∨ -b^{153, 2}_0 ∨ false 
c  in DIMACS:
-20936 -20937 -20938  0

c i = 3
c  -2+1 --> -1
c    ( b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧  p_459) -> ( b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0)
c  in CNF:
c    -b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨  b^{153, 4}_2
c    -b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_1
c    -b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨  b^{153, 4}_0
c  in DIMACS:
-20939 -20940  20941 -459  20942 0
-20939 -20940  20941 -459 -20943 0
-20939 -20940  20941 -459  20944 0

c  -1+1 --> 0
c    ( b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0 ∧  p_459) -> (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧ -b^{153, 4}_0)
c  in CNF:
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_2
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_1
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_0
c  in DIMACS:
-20939  20940 -20941 -459 -20942 0
-20939  20940 -20941 -459 -20943 0
-20939  20940 -20941 -459 -20944 0

c  0+1 --> 1
c    (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧  p_459) -> (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0)
c  in CNF:
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_2
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_1
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨  b^{153, 4}_0
c  in DIMACS:
 20939  20940  20941 -459 -20942 0
 20939  20940  20941 -459 -20943 0
 20939  20940  20941 -459  20944 0

c  1+1 --> 2
c    (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0 ∧  p_459) -> (-b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0)
c  in CNF:
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_2
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨  b^{153, 4}_1
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ -p_459 ∨ -b^{153, 4}_0
c  in DIMACS:
 20939  20940 -20941 -459 -20942 0
 20939  20940 -20941 -459  20943 0
 20939  20940 -20941 -459 -20944 0

c  2+1 --> break 
c    (-b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧  p_459) -> break
c  in CNF:
c     b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ -p_459 ∨ break
c  in DIMACS:
 20939 -20940  20941 -459 1162 0


c  2-1 --> 1
c    (-b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧ -p_459) -> (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0)
c  in CNF:
c     b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_2
c     b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_1
c     b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨  b^{153, 4}_0
c  in DIMACS:
 20939 -20940  20941  459 -20942 0
 20939 -20940  20941  459 -20943 0
 20939 -20940  20941  459  20944 0

c  1-1 --> 0
c    (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0 ∧ -p_459) -> (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧ -b^{153, 4}_0)
c  in CNF:
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_2
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_1
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_0
c  in DIMACS:
 20939  20940 -20941  459 -20942 0
 20939  20940 -20941  459 -20943 0
 20939  20940 -20941  459 -20944 0

c  0-1 --> -1
c    (-b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧ -p_459) -> ( b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0)
c  in CNF:
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨  b^{153, 4}_2
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_1
c     b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨  b^{153, 4}_0
c  in DIMACS:
 20939  20940  20941  459  20942 0
 20939  20940  20941  459 -20943 0
 20939  20940  20941  459  20944 0

c  -1-1 --> -2
c    ( b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧  b^{153, 3}_0 ∧ -p_459) -> ( b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0)
c  in CNF:
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨  b^{153, 4}_2
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨  b^{153, 4}_1
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨  p_459 ∨ -b^{153, 4}_0
c  in DIMACS:
-20939  20940 -20941  459  20942 0
-20939  20940 -20941  459  20943 0
-20939  20940 -20941  459 -20944 0

c  -2-1 --> break 
c    ( b^{153, 3}_2 ∧  b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧ -p_459) -> break
c  in CNF:
c    -b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨  b^{153, 3}_0 ∨  p_459 ∨ break
c  in DIMACS:
-20939 -20940  20941  459 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 3}_2 ∧ -b^{153, 3}_1 ∧ -b^{153, 3}_0 ∧ true) 
c  in CNF:
c    -b^{153, 3}_2 ∨  b^{153, 3}_1 ∨  b^{153, 3}_0 ∨ false 
c  in DIMACS:
-20939  20940  20941  0

c  3 does not represent an automaton state.
c    -(-b^{153, 3}_2 ∧  b^{153, 3}_1 ∧  b^{153, 3}_0 ∧ true) 
c  in CNF:
c     b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ false 
c  in DIMACS:
 20939 -20940 -20941  0
c  -3 does not represent an automaton state.
c    -( b^{153, 3}_2 ∧  b^{153, 3}_1 ∧  b^{153, 3}_0 ∧ true) 
c  in CNF:
c    -b^{153, 3}_2 ∨ -b^{153, 3}_1 ∨ -b^{153, 3}_0 ∨ false 
c  in DIMACS:
-20939 -20940 -20941  0

c i = 4
c  -2+1 --> -1
c    ( b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧  p_612) -> ( b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0)
c  in CNF:
c    -b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨  b^{153, 5}_2
c    -b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_1
c    -b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨  b^{153, 5}_0
c  in DIMACS:
-20942 -20943  20944 -612  20945 0
-20942 -20943  20944 -612 -20946 0
-20942 -20943  20944 -612  20947 0

c  -1+1 --> 0
c    ( b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0 ∧  p_612) -> (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧ -b^{153, 5}_0)
c  in CNF:
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_2
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_1
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_0
c  in DIMACS:
-20942  20943 -20944 -612 -20945 0
-20942  20943 -20944 -612 -20946 0
-20942  20943 -20944 -612 -20947 0

c  0+1 --> 1
c    (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧  p_612) -> (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0)
c  in CNF:
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_2
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_1
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨  b^{153, 5}_0
c  in DIMACS:
 20942  20943  20944 -612 -20945 0
 20942  20943  20944 -612 -20946 0
 20942  20943  20944 -612  20947 0

c  1+1 --> 2
c    (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0 ∧  p_612) -> (-b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0)
c  in CNF:
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_2
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨  b^{153, 5}_1
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ -p_612 ∨ -b^{153, 5}_0
c  in DIMACS:
 20942  20943 -20944 -612 -20945 0
 20942  20943 -20944 -612  20946 0
 20942  20943 -20944 -612 -20947 0

c  2+1 --> break 
c    (-b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧  p_612) -> break
c  in CNF:
c     b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 20942 -20943  20944 -612 1162 0


c  2-1 --> 1
c    (-b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧ -p_612) -> (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0)
c  in CNF:
c     b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_2
c     b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_1
c     b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨  b^{153, 5}_0
c  in DIMACS:
 20942 -20943  20944  612 -20945 0
 20942 -20943  20944  612 -20946 0
 20942 -20943  20944  612  20947 0

c  1-1 --> 0
c    (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0 ∧ -p_612) -> (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧ -b^{153, 5}_0)
c  in CNF:
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_2
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_1
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_0
c  in DIMACS:
 20942  20943 -20944  612 -20945 0
 20942  20943 -20944  612 -20946 0
 20942  20943 -20944  612 -20947 0

c  0-1 --> -1
c    (-b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧ -p_612) -> ( b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0)
c  in CNF:
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨  b^{153, 5}_2
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_1
c     b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨  b^{153, 5}_0
c  in DIMACS:
 20942  20943  20944  612  20945 0
 20942  20943  20944  612 -20946 0
 20942  20943  20944  612  20947 0

c  -1-1 --> -2
c    ( b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧  b^{153, 4}_0 ∧ -p_612) -> ( b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0)
c  in CNF:
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨  b^{153, 5}_2
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨  b^{153, 5}_1
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨  p_612 ∨ -b^{153, 5}_0
c  in DIMACS:
-20942  20943 -20944  612  20945 0
-20942  20943 -20944  612  20946 0
-20942  20943 -20944  612 -20947 0

c  -2-1 --> break 
c    ( b^{153, 4}_2 ∧  b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨  b^{153, 4}_0 ∨  p_612 ∨ break
c  in DIMACS:
-20942 -20943  20944  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 4}_2 ∧ -b^{153, 4}_1 ∧ -b^{153, 4}_0 ∧ true) 
c  in CNF:
c    -b^{153, 4}_2 ∨  b^{153, 4}_1 ∨  b^{153, 4}_0 ∨ false 
c  in DIMACS:
-20942  20943  20944  0

c  3 does not represent an automaton state.
c    -(-b^{153, 4}_2 ∧  b^{153, 4}_1 ∧  b^{153, 4}_0 ∧ true) 
c  in CNF:
c     b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ false 
c  in DIMACS:
 20942 -20943 -20944  0
c  -3 does not represent an automaton state.
c    -( b^{153, 4}_2 ∧  b^{153, 4}_1 ∧  b^{153, 4}_0 ∧ true) 
c  in CNF:
c    -b^{153, 4}_2 ∨ -b^{153, 4}_1 ∨ -b^{153, 4}_0 ∨ false 
c  in DIMACS:
-20942 -20943 -20944  0

c i = 5
c  -2+1 --> -1
c    ( b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧  p_765) -> ( b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0)
c  in CNF:
c    -b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨  b^{153, 6}_2
c    -b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_1
c    -b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨  b^{153, 6}_0
c  in DIMACS:
-20945 -20946  20947 -765  20948 0
-20945 -20946  20947 -765 -20949 0
-20945 -20946  20947 -765  20950 0

c  -1+1 --> 0
c    ( b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0 ∧  p_765) -> (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧ -b^{153, 6}_0)
c  in CNF:
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_2
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_1
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_0
c  in DIMACS:
-20945  20946 -20947 -765 -20948 0
-20945  20946 -20947 -765 -20949 0
-20945  20946 -20947 -765 -20950 0

c  0+1 --> 1
c    (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧  p_765) -> (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0)
c  in CNF:
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_2
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_1
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨  b^{153, 6}_0
c  in DIMACS:
 20945  20946  20947 -765 -20948 0
 20945  20946  20947 -765 -20949 0
 20945  20946  20947 -765  20950 0

c  1+1 --> 2
c    (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0 ∧  p_765) -> (-b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0)
c  in CNF:
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_2
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨  b^{153, 6}_1
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ -p_765 ∨ -b^{153, 6}_0
c  in DIMACS:
 20945  20946 -20947 -765 -20948 0
 20945  20946 -20947 -765  20949 0
 20945  20946 -20947 -765 -20950 0

c  2+1 --> break 
c    (-b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧  p_765) -> break
c  in CNF:
c     b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 20945 -20946  20947 -765 1162 0


c  2-1 --> 1
c    (-b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧ -p_765) -> (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0)
c  in CNF:
c     b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_2
c     b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_1
c     b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨  b^{153, 6}_0
c  in DIMACS:
 20945 -20946  20947  765 -20948 0
 20945 -20946  20947  765 -20949 0
 20945 -20946  20947  765  20950 0

c  1-1 --> 0
c    (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0 ∧ -p_765) -> (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧ -b^{153, 6}_0)
c  in CNF:
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_2
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_1
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_0
c  in DIMACS:
 20945  20946 -20947  765 -20948 0
 20945  20946 -20947  765 -20949 0
 20945  20946 -20947  765 -20950 0

c  0-1 --> -1
c    (-b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧ -p_765) -> ( b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0)
c  in CNF:
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨  b^{153, 6}_2
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_1
c     b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨  b^{153, 6}_0
c  in DIMACS:
 20945  20946  20947  765  20948 0
 20945  20946  20947  765 -20949 0
 20945  20946  20947  765  20950 0

c  -1-1 --> -2
c    ( b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧  b^{153, 5}_0 ∧ -p_765) -> ( b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0)
c  in CNF:
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨  b^{153, 6}_2
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨  b^{153, 6}_1
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨  p_765 ∨ -b^{153, 6}_0
c  in DIMACS:
-20945  20946 -20947  765  20948 0
-20945  20946 -20947  765  20949 0
-20945  20946 -20947  765 -20950 0

c  -2-1 --> break 
c    ( b^{153, 5}_2 ∧  b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨  b^{153, 5}_0 ∨  p_765 ∨ break
c  in DIMACS:
-20945 -20946  20947  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 5}_2 ∧ -b^{153, 5}_1 ∧ -b^{153, 5}_0 ∧ true) 
c  in CNF:
c    -b^{153, 5}_2 ∨  b^{153, 5}_1 ∨  b^{153, 5}_0 ∨ false 
c  in DIMACS:
-20945  20946  20947  0

c  3 does not represent an automaton state.
c    -(-b^{153, 5}_2 ∧  b^{153, 5}_1 ∧  b^{153, 5}_0 ∧ true) 
c  in CNF:
c     b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ false 
c  in DIMACS:
 20945 -20946 -20947  0
c  -3 does not represent an automaton state.
c    -( b^{153, 5}_2 ∧  b^{153, 5}_1 ∧  b^{153, 5}_0 ∧ true) 
c  in CNF:
c    -b^{153, 5}_2 ∨ -b^{153, 5}_1 ∨ -b^{153, 5}_0 ∨ false 
c  in DIMACS:
-20945 -20946 -20947  0

c i = 6
c  -2+1 --> -1
c    ( b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧  p_918) -> ( b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0)
c  in CNF:
c    -b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨  b^{153, 7}_2
c    -b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_1
c    -b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨  b^{153, 7}_0
c  in DIMACS:
-20948 -20949  20950 -918  20951 0
-20948 -20949  20950 -918 -20952 0
-20948 -20949  20950 -918  20953 0

c  -1+1 --> 0
c    ( b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0 ∧  p_918) -> (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧ -b^{153, 7}_0)
c  in CNF:
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_2
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_1
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_0
c  in DIMACS:
-20948  20949 -20950 -918 -20951 0
-20948  20949 -20950 -918 -20952 0
-20948  20949 -20950 -918 -20953 0

c  0+1 --> 1
c    (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧  p_918) -> (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0)
c  in CNF:
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_2
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_1
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨  b^{153, 7}_0
c  in DIMACS:
 20948  20949  20950 -918 -20951 0
 20948  20949  20950 -918 -20952 0
 20948  20949  20950 -918  20953 0

c  1+1 --> 2
c    (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0 ∧  p_918) -> (-b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0)
c  in CNF:
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_2
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨  b^{153, 7}_1
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ -p_918 ∨ -b^{153, 7}_0
c  in DIMACS:
 20948  20949 -20950 -918 -20951 0
 20948  20949 -20950 -918  20952 0
 20948  20949 -20950 -918 -20953 0

c  2+1 --> break 
c    (-b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧  p_918) -> break
c  in CNF:
c     b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 20948 -20949  20950 -918 1162 0


c  2-1 --> 1
c    (-b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧ -p_918) -> (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0)
c  in CNF:
c     b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_2
c     b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_1
c     b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨  b^{153, 7}_0
c  in DIMACS:
 20948 -20949  20950  918 -20951 0
 20948 -20949  20950  918 -20952 0
 20948 -20949  20950  918  20953 0

c  1-1 --> 0
c    (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0 ∧ -p_918) -> (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧ -b^{153, 7}_0)
c  in CNF:
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_2
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_1
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_0
c  in DIMACS:
 20948  20949 -20950  918 -20951 0
 20948  20949 -20950  918 -20952 0
 20948  20949 -20950  918 -20953 0

c  0-1 --> -1
c    (-b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧ -p_918) -> ( b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0)
c  in CNF:
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨  b^{153, 7}_2
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_1
c     b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨  b^{153, 7}_0
c  in DIMACS:
 20948  20949  20950  918  20951 0
 20948  20949  20950  918 -20952 0
 20948  20949  20950  918  20953 0

c  -1-1 --> -2
c    ( b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧  b^{153, 6}_0 ∧ -p_918) -> ( b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0)
c  in CNF:
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨  b^{153, 7}_2
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨  b^{153, 7}_1
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨  p_918 ∨ -b^{153, 7}_0
c  in DIMACS:
-20948  20949 -20950  918  20951 0
-20948  20949 -20950  918  20952 0
-20948  20949 -20950  918 -20953 0

c  -2-1 --> break 
c    ( b^{153, 6}_2 ∧  b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨  b^{153, 6}_0 ∨  p_918 ∨ break
c  in DIMACS:
-20948 -20949  20950  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 6}_2 ∧ -b^{153, 6}_1 ∧ -b^{153, 6}_0 ∧ true) 
c  in CNF:
c    -b^{153, 6}_2 ∨  b^{153, 6}_1 ∨  b^{153, 6}_0 ∨ false 
c  in DIMACS:
-20948  20949  20950  0

c  3 does not represent an automaton state.
c    -(-b^{153, 6}_2 ∧  b^{153, 6}_1 ∧  b^{153, 6}_0 ∧ true) 
c  in CNF:
c     b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ false 
c  in DIMACS:
 20948 -20949 -20950  0
c  -3 does not represent an automaton state.
c    -( b^{153, 6}_2 ∧  b^{153, 6}_1 ∧  b^{153, 6}_0 ∧ true) 
c  in CNF:
c    -b^{153, 6}_2 ∨ -b^{153, 6}_1 ∨ -b^{153, 6}_0 ∨ false 
c  in DIMACS:
-20948 -20949 -20950  0

c i = 7
c  -2+1 --> -1
c    ( b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧  p_1071) -> ( b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧  b^{153, 8}_0)
c  in CNF:
c    -b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨  b^{153, 8}_2
c    -b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_1
c    -b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨  b^{153, 8}_0
c  in DIMACS:
-20951 -20952  20953 -1071  20954 0
-20951 -20952  20953 -1071 -20955 0
-20951 -20952  20953 -1071  20956 0

c  -1+1 --> 0
c    ( b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0 ∧  p_1071) -> (-b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧ -b^{153, 8}_0)
c  in CNF:
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_2
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_1
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_0
c  in DIMACS:
-20951  20952 -20953 -1071 -20954 0
-20951  20952 -20953 -1071 -20955 0
-20951  20952 -20953 -1071 -20956 0

c  0+1 --> 1
c    (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧  p_1071) -> (-b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧  b^{153, 8}_0)
c  in CNF:
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_2
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_1
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨  b^{153, 8}_0
c  in DIMACS:
 20951  20952  20953 -1071 -20954 0
 20951  20952  20953 -1071 -20955 0
 20951  20952  20953 -1071  20956 0

c  1+1 --> 2
c    (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0 ∧  p_1071) -> (-b^{153, 8}_2 ∧  b^{153, 8}_1 ∧ -b^{153, 8}_0)
c  in CNF:
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_2
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨  b^{153, 8}_1
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ -p_1071 ∨ -b^{153, 8}_0
c  in DIMACS:
 20951  20952 -20953 -1071 -20954 0
 20951  20952 -20953 -1071  20955 0
 20951  20952 -20953 -1071 -20956 0

c  2+1 --> break 
c    (-b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 20951 -20952  20953 -1071 1162 0


c  2-1 --> 1
c    (-b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧ -p_1071) -> (-b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧  b^{153, 8}_0)
c  in CNF:
c     b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_2
c     b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_1
c     b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨  b^{153, 8}_0
c  in DIMACS:
 20951 -20952  20953  1071 -20954 0
 20951 -20952  20953  1071 -20955 0
 20951 -20952  20953  1071  20956 0

c  1-1 --> 0
c    (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0 ∧ -p_1071) -> (-b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧ -b^{153, 8}_0)
c  in CNF:
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_2
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_1
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_0
c  in DIMACS:
 20951  20952 -20953  1071 -20954 0
 20951  20952 -20953  1071 -20955 0
 20951  20952 -20953  1071 -20956 0

c  0-1 --> -1
c    (-b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧ -p_1071) -> ( b^{153, 8}_2 ∧ -b^{153, 8}_1 ∧  b^{153, 8}_0)
c  in CNF:
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨  b^{153, 8}_2
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_1
c     b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨  b^{153, 8}_0
c  in DIMACS:
 20951  20952  20953  1071  20954 0
 20951  20952  20953  1071 -20955 0
 20951  20952  20953  1071  20956 0

c  -1-1 --> -2
c    ( b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧  b^{153, 7}_0 ∧ -p_1071) -> ( b^{153, 8}_2 ∧  b^{153, 8}_1 ∧ -b^{153, 8}_0)
c  in CNF:
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨  b^{153, 8}_2
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨  b^{153, 8}_1
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨  p_1071 ∨ -b^{153, 8}_0
c  in DIMACS:
-20951  20952 -20953  1071  20954 0
-20951  20952 -20953  1071  20955 0
-20951  20952 -20953  1071 -20956 0

c  -2-1 --> break 
c    ( b^{153, 7}_2 ∧  b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨  b^{153, 7}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-20951 -20952  20953  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{153, 7}_2 ∧ -b^{153, 7}_1 ∧ -b^{153, 7}_0 ∧ true) 
c  in CNF:
c    -b^{153, 7}_2 ∨  b^{153, 7}_1 ∨  b^{153, 7}_0 ∨ false 
c  in DIMACS:
-20951  20952  20953  0

c  3 does not represent an automaton state.
c    -(-b^{153, 7}_2 ∧  b^{153, 7}_1 ∧  b^{153, 7}_0 ∧ true) 
c  in CNF:
c     b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ false 
c  in DIMACS:
 20951 -20952 -20953  0
c  -3 does not represent an automaton state.
c    -( b^{153, 7}_2 ∧  b^{153, 7}_1 ∧  b^{153, 7}_0 ∧ true) 
c  in CNF:
c    -b^{153, 7}_2 ∨ -b^{153, 7}_1 ∨ -b^{153, 7}_0 ∨ false 
c  in DIMACS:
-20951 -20952 -20953  0

c INIT for k = 154
c    -b^{154, 1}_2
c    -b^{154, 1}_1
c    -b^{154, 1}_0
c  in DIMACS:
-20957 0
-20958 0
-20959 0

c Transitions for k = 154
c i = 1
c  -2+1 --> -1
c    ( b^{154, 1}_2 ∧  b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧  p_154) -> ( b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0)
c  in CNF:
c    -b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨  b^{154, 2}_2
c    -b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_1
c    -b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨  b^{154, 2}_0
c  in DIMACS:
-20957 -20958  20959 -154  20960 0
-20957 -20958  20959 -154 -20961 0
-20957 -20958  20959 -154  20962 0

c  -1+1 --> 0
c    ( b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧  b^{154, 1}_0 ∧  p_154) -> (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧ -b^{154, 2}_0)
c  in CNF:
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_2
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_1
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_0
c  in DIMACS:
-20957  20958 -20959 -154 -20960 0
-20957  20958 -20959 -154 -20961 0
-20957  20958 -20959 -154 -20962 0

c  0+1 --> 1
c    (-b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧  p_154) -> (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0)
c  in CNF:
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_2
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_1
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨  b^{154, 2}_0
c  in DIMACS:
 20957  20958  20959 -154 -20960 0
 20957  20958  20959 -154 -20961 0
 20957  20958  20959 -154  20962 0

c  1+1 --> 2
c    (-b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧  b^{154, 1}_0 ∧  p_154) -> (-b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0)
c  in CNF:
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_2
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨  b^{154, 2}_1
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ -p_154 ∨ -b^{154, 2}_0
c  in DIMACS:
 20957  20958 -20959 -154 -20960 0
 20957  20958 -20959 -154  20961 0
 20957  20958 -20959 -154 -20962 0

c  2+1 --> break 
c    (-b^{154, 1}_2 ∧  b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧  p_154) -> break
c  in CNF:
c     b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ -p_154 ∨ break
c  in DIMACS:
 20957 -20958  20959 -154 1162 0


c  2-1 --> 1
c    (-b^{154, 1}_2 ∧  b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧ -p_154) -> (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0)
c  in CNF:
c     b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_2
c     b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_1
c     b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨  b^{154, 2}_0
c  in DIMACS:
 20957 -20958  20959  154 -20960 0
 20957 -20958  20959  154 -20961 0
 20957 -20958  20959  154  20962 0

c  1-1 --> 0
c    (-b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧  b^{154, 1}_0 ∧ -p_154) -> (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧ -b^{154, 2}_0)
c  in CNF:
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_2
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_1
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_0
c  in DIMACS:
 20957  20958 -20959  154 -20960 0
 20957  20958 -20959  154 -20961 0
 20957  20958 -20959  154 -20962 0

c  0-1 --> -1
c    (-b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧ -p_154) -> ( b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0)
c  in CNF:
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨  b^{154, 2}_2
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_1
c     b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨  b^{154, 2}_0
c  in DIMACS:
 20957  20958  20959  154  20960 0
 20957  20958  20959  154 -20961 0
 20957  20958  20959  154  20962 0

c  -1-1 --> -2
c    ( b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧  b^{154, 1}_0 ∧ -p_154) -> ( b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0)
c  in CNF:
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨  b^{154, 2}_2
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨  b^{154, 2}_1
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨  p_154 ∨ -b^{154, 2}_0
c  in DIMACS:
-20957  20958 -20959  154  20960 0
-20957  20958 -20959  154  20961 0
-20957  20958 -20959  154 -20962 0

c  -2-1 --> break 
c    ( b^{154, 1}_2 ∧  b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧ -p_154) -> break
c  in CNF:
c    -b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨  b^{154, 1}_0 ∨  p_154 ∨ break
c  in DIMACS:
-20957 -20958  20959  154 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 1}_2 ∧ -b^{154, 1}_1 ∧ -b^{154, 1}_0 ∧ true) 
c  in CNF:
c    -b^{154, 1}_2 ∨  b^{154, 1}_1 ∨  b^{154, 1}_0 ∨ false 
c  in DIMACS:
-20957  20958  20959  0

c  3 does not represent an automaton state.
c    -(-b^{154, 1}_2 ∧  b^{154, 1}_1 ∧  b^{154, 1}_0 ∧ true) 
c  in CNF:
c     b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ false 
c  in DIMACS:
 20957 -20958 -20959  0
c  -3 does not represent an automaton state.
c    -( b^{154, 1}_2 ∧  b^{154, 1}_1 ∧  b^{154, 1}_0 ∧ true) 
c  in CNF:
c    -b^{154, 1}_2 ∨ -b^{154, 1}_1 ∨ -b^{154, 1}_0 ∨ false 
c  in DIMACS:
-20957 -20958 -20959  0

c i = 2
c  -2+1 --> -1
c    ( b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧  p_308) -> ( b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0)
c  in CNF:
c    -b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨  b^{154, 3}_2
c    -b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_1
c    -b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨  b^{154, 3}_0
c  in DIMACS:
-20960 -20961  20962 -308  20963 0
-20960 -20961  20962 -308 -20964 0
-20960 -20961  20962 -308  20965 0

c  -1+1 --> 0
c    ( b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0 ∧  p_308) -> (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧ -b^{154, 3}_0)
c  in CNF:
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_2
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_1
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_0
c  in DIMACS:
-20960  20961 -20962 -308 -20963 0
-20960  20961 -20962 -308 -20964 0
-20960  20961 -20962 -308 -20965 0

c  0+1 --> 1
c    (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧  p_308) -> (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0)
c  in CNF:
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_2
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_1
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨  b^{154, 3}_0
c  in DIMACS:
 20960  20961  20962 -308 -20963 0
 20960  20961  20962 -308 -20964 0
 20960  20961  20962 -308  20965 0

c  1+1 --> 2
c    (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0 ∧  p_308) -> (-b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0)
c  in CNF:
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_2
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨  b^{154, 3}_1
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ -p_308 ∨ -b^{154, 3}_0
c  in DIMACS:
 20960  20961 -20962 -308 -20963 0
 20960  20961 -20962 -308  20964 0
 20960  20961 -20962 -308 -20965 0

c  2+1 --> break 
c    (-b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧  p_308) -> break
c  in CNF:
c     b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 20960 -20961  20962 -308 1162 0


c  2-1 --> 1
c    (-b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧ -p_308) -> (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0)
c  in CNF:
c     b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_2
c     b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_1
c     b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨  b^{154, 3}_0
c  in DIMACS:
 20960 -20961  20962  308 -20963 0
 20960 -20961  20962  308 -20964 0
 20960 -20961  20962  308  20965 0

c  1-1 --> 0
c    (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0 ∧ -p_308) -> (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧ -b^{154, 3}_0)
c  in CNF:
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_2
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_1
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_0
c  in DIMACS:
 20960  20961 -20962  308 -20963 0
 20960  20961 -20962  308 -20964 0
 20960  20961 -20962  308 -20965 0

c  0-1 --> -1
c    (-b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧ -p_308) -> ( b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0)
c  in CNF:
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨  b^{154, 3}_2
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_1
c     b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨  b^{154, 3}_0
c  in DIMACS:
 20960  20961  20962  308  20963 0
 20960  20961  20962  308 -20964 0
 20960  20961  20962  308  20965 0

c  -1-1 --> -2
c    ( b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧  b^{154, 2}_0 ∧ -p_308) -> ( b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0)
c  in CNF:
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨  b^{154, 3}_2
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨  b^{154, 3}_1
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨  p_308 ∨ -b^{154, 3}_0
c  in DIMACS:
-20960  20961 -20962  308  20963 0
-20960  20961 -20962  308  20964 0
-20960  20961 -20962  308 -20965 0

c  -2-1 --> break 
c    ( b^{154, 2}_2 ∧  b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨  b^{154, 2}_0 ∨  p_308 ∨ break
c  in DIMACS:
-20960 -20961  20962  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 2}_2 ∧ -b^{154, 2}_1 ∧ -b^{154, 2}_0 ∧ true) 
c  in CNF:
c    -b^{154, 2}_2 ∨  b^{154, 2}_1 ∨  b^{154, 2}_0 ∨ false 
c  in DIMACS:
-20960  20961  20962  0

c  3 does not represent an automaton state.
c    -(-b^{154, 2}_2 ∧  b^{154, 2}_1 ∧  b^{154, 2}_0 ∧ true) 
c  in CNF:
c     b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ false 
c  in DIMACS:
 20960 -20961 -20962  0
c  -3 does not represent an automaton state.
c    -( b^{154, 2}_2 ∧  b^{154, 2}_1 ∧  b^{154, 2}_0 ∧ true) 
c  in CNF:
c    -b^{154, 2}_2 ∨ -b^{154, 2}_1 ∨ -b^{154, 2}_0 ∨ false 
c  in DIMACS:
-20960 -20961 -20962  0

c i = 3
c  -2+1 --> -1
c    ( b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧  p_462) -> ( b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0)
c  in CNF:
c    -b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨  b^{154, 4}_2
c    -b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_1
c    -b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨  b^{154, 4}_0
c  in DIMACS:
-20963 -20964  20965 -462  20966 0
-20963 -20964  20965 -462 -20967 0
-20963 -20964  20965 -462  20968 0

c  -1+1 --> 0
c    ( b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0 ∧  p_462) -> (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧ -b^{154, 4}_0)
c  in CNF:
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_2
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_1
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_0
c  in DIMACS:
-20963  20964 -20965 -462 -20966 0
-20963  20964 -20965 -462 -20967 0
-20963  20964 -20965 -462 -20968 0

c  0+1 --> 1
c    (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧  p_462) -> (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0)
c  in CNF:
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_2
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_1
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨  b^{154, 4}_0
c  in DIMACS:
 20963  20964  20965 -462 -20966 0
 20963  20964  20965 -462 -20967 0
 20963  20964  20965 -462  20968 0

c  1+1 --> 2
c    (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0 ∧  p_462) -> (-b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0)
c  in CNF:
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_2
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨  b^{154, 4}_1
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ -p_462 ∨ -b^{154, 4}_0
c  in DIMACS:
 20963  20964 -20965 -462 -20966 0
 20963  20964 -20965 -462  20967 0
 20963  20964 -20965 -462 -20968 0

c  2+1 --> break 
c    (-b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧  p_462) -> break
c  in CNF:
c     b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 20963 -20964  20965 -462 1162 0


c  2-1 --> 1
c    (-b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧ -p_462) -> (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0)
c  in CNF:
c     b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_2
c     b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_1
c     b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨  b^{154, 4}_0
c  in DIMACS:
 20963 -20964  20965  462 -20966 0
 20963 -20964  20965  462 -20967 0
 20963 -20964  20965  462  20968 0

c  1-1 --> 0
c    (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0 ∧ -p_462) -> (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧ -b^{154, 4}_0)
c  in CNF:
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_2
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_1
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_0
c  in DIMACS:
 20963  20964 -20965  462 -20966 0
 20963  20964 -20965  462 -20967 0
 20963  20964 -20965  462 -20968 0

c  0-1 --> -1
c    (-b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧ -p_462) -> ( b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0)
c  in CNF:
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨  b^{154, 4}_2
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_1
c     b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨  b^{154, 4}_0
c  in DIMACS:
 20963  20964  20965  462  20966 0
 20963  20964  20965  462 -20967 0
 20963  20964  20965  462  20968 0

c  -1-1 --> -2
c    ( b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧  b^{154, 3}_0 ∧ -p_462) -> ( b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0)
c  in CNF:
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨  b^{154, 4}_2
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨  b^{154, 4}_1
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨  p_462 ∨ -b^{154, 4}_0
c  in DIMACS:
-20963  20964 -20965  462  20966 0
-20963  20964 -20965  462  20967 0
-20963  20964 -20965  462 -20968 0

c  -2-1 --> break 
c    ( b^{154, 3}_2 ∧  b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨  b^{154, 3}_0 ∨  p_462 ∨ break
c  in DIMACS:
-20963 -20964  20965  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 3}_2 ∧ -b^{154, 3}_1 ∧ -b^{154, 3}_0 ∧ true) 
c  in CNF:
c    -b^{154, 3}_2 ∨  b^{154, 3}_1 ∨  b^{154, 3}_0 ∨ false 
c  in DIMACS:
-20963  20964  20965  0

c  3 does not represent an automaton state.
c    -(-b^{154, 3}_2 ∧  b^{154, 3}_1 ∧  b^{154, 3}_0 ∧ true) 
c  in CNF:
c     b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ false 
c  in DIMACS:
 20963 -20964 -20965  0
c  -3 does not represent an automaton state.
c    -( b^{154, 3}_2 ∧  b^{154, 3}_1 ∧  b^{154, 3}_0 ∧ true) 
c  in CNF:
c    -b^{154, 3}_2 ∨ -b^{154, 3}_1 ∨ -b^{154, 3}_0 ∨ false 
c  in DIMACS:
-20963 -20964 -20965  0

c i = 4
c  -2+1 --> -1
c    ( b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧  p_616) -> ( b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0)
c  in CNF:
c    -b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨  b^{154, 5}_2
c    -b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_1
c    -b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨  b^{154, 5}_0
c  in DIMACS:
-20966 -20967  20968 -616  20969 0
-20966 -20967  20968 -616 -20970 0
-20966 -20967  20968 -616  20971 0

c  -1+1 --> 0
c    ( b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0 ∧  p_616) -> (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧ -b^{154, 5}_0)
c  in CNF:
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_2
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_1
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_0
c  in DIMACS:
-20966  20967 -20968 -616 -20969 0
-20966  20967 -20968 -616 -20970 0
-20966  20967 -20968 -616 -20971 0

c  0+1 --> 1
c    (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧  p_616) -> (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0)
c  in CNF:
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_2
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_1
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨  b^{154, 5}_0
c  in DIMACS:
 20966  20967  20968 -616 -20969 0
 20966  20967  20968 -616 -20970 0
 20966  20967  20968 -616  20971 0

c  1+1 --> 2
c    (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0 ∧  p_616) -> (-b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0)
c  in CNF:
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_2
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨  b^{154, 5}_1
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ -p_616 ∨ -b^{154, 5}_0
c  in DIMACS:
 20966  20967 -20968 -616 -20969 0
 20966  20967 -20968 -616  20970 0
 20966  20967 -20968 -616 -20971 0

c  2+1 --> break 
c    (-b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧  p_616) -> break
c  in CNF:
c     b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 20966 -20967  20968 -616 1162 0


c  2-1 --> 1
c    (-b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧ -p_616) -> (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0)
c  in CNF:
c     b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_2
c     b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_1
c     b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨  b^{154, 5}_0
c  in DIMACS:
 20966 -20967  20968  616 -20969 0
 20966 -20967  20968  616 -20970 0
 20966 -20967  20968  616  20971 0

c  1-1 --> 0
c    (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0 ∧ -p_616) -> (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧ -b^{154, 5}_0)
c  in CNF:
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_2
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_1
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_0
c  in DIMACS:
 20966  20967 -20968  616 -20969 0
 20966  20967 -20968  616 -20970 0
 20966  20967 -20968  616 -20971 0

c  0-1 --> -1
c    (-b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧ -p_616) -> ( b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0)
c  in CNF:
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨  b^{154, 5}_2
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_1
c     b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨  b^{154, 5}_0
c  in DIMACS:
 20966  20967  20968  616  20969 0
 20966  20967  20968  616 -20970 0
 20966  20967  20968  616  20971 0

c  -1-1 --> -2
c    ( b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧  b^{154, 4}_0 ∧ -p_616) -> ( b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0)
c  in CNF:
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨  b^{154, 5}_2
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨  b^{154, 5}_1
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨  p_616 ∨ -b^{154, 5}_0
c  in DIMACS:
-20966  20967 -20968  616  20969 0
-20966  20967 -20968  616  20970 0
-20966  20967 -20968  616 -20971 0

c  -2-1 --> break 
c    ( b^{154, 4}_2 ∧  b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨  b^{154, 4}_0 ∨  p_616 ∨ break
c  in DIMACS:
-20966 -20967  20968  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 4}_2 ∧ -b^{154, 4}_1 ∧ -b^{154, 4}_0 ∧ true) 
c  in CNF:
c    -b^{154, 4}_2 ∨  b^{154, 4}_1 ∨  b^{154, 4}_0 ∨ false 
c  in DIMACS:
-20966  20967  20968  0

c  3 does not represent an automaton state.
c    -(-b^{154, 4}_2 ∧  b^{154, 4}_1 ∧  b^{154, 4}_0 ∧ true) 
c  in CNF:
c     b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ false 
c  in DIMACS:
 20966 -20967 -20968  0
c  -3 does not represent an automaton state.
c    -( b^{154, 4}_2 ∧  b^{154, 4}_1 ∧  b^{154, 4}_0 ∧ true) 
c  in CNF:
c    -b^{154, 4}_2 ∨ -b^{154, 4}_1 ∨ -b^{154, 4}_0 ∨ false 
c  in DIMACS:
-20966 -20967 -20968  0

c i = 5
c  -2+1 --> -1
c    ( b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧  p_770) -> ( b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0)
c  in CNF:
c    -b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨  b^{154, 6}_2
c    -b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_1
c    -b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨  b^{154, 6}_0
c  in DIMACS:
-20969 -20970  20971 -770  20972 0
-20969 -20970  20971 -770 -20973 0
-20969 -20970  20971 -770  20974 0

c  -1+1 --> 0
c    ( b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0 ∧  p_770) -> (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧ -b^{154, 6}_0)
c  in CNF:
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_2
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_1
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_0
c  in DIMACS:
-20969  20970 -20971 -770 -20972 0
-20969  20970 -20971 -770 -20973 0
-20969  20970 -20971 -770 -20974 0

c  0+1 --> 1
c    (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧  p_770) -> (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0)
c  in CNF:
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_2
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_1
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨  b^{154, 6}_0
c  in DIMACS:
 20969  20970  20971 -770 -20972 0
 20969  20970  20971 -770 -20973 0
 20969  20970  20971 -770  20974 0

c  1+1 --> 2
c    (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0 ∧  p_770) -> (-b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0)
c  in CNF:
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_2
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨  b^{154, 6}_1
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ -p_770 ∨ -b^{154, 6}_0
c  in DIMACS:
 20969  20970 -20971 -770 -20972 0
 20969  20970 -20971 -770  20973 0
 20969  20970 -20971 -770 -20974 0

c  2+1 --> break 
c    (-b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧  p_770) -> break
c  in CNF:
c     b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 20969 -20970  20971 -770 1162 0


c  2-1 --> 1
c    (-b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧ -p_770) -> (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0)
c  in CNF:
c     b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_2
c     b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_1
c     b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨  b^{154, 6}_0
c  in DIMACS:
 20969 -20970  20971  770 -20972 0
 20969 -20970  20971  770 -20973 0
 20969 -20970  20971  770  20974 0

c  1-1 --> 0
c    (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0 ∧ -p_770) -> (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧ -b^{154, 6}_0)
c  in CNF:
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_2
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_1
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_0
c  in DIMACS:
 20969  20970 -20971  770 -20972 0
 20969  20970 -20971  770 -20973 0
 20969  20970 -20971  770 -20974 0

c  0-1 --> -1
c    (-b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧ -p_770) -> ( b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0)
c  in CNF:
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨  b^{154, 6}_2
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_1
c     b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨  b^{154, 6}_0
c  in DIMACS:
 20969  20970  20971  770  20972 0
 20969  20970  20971  770 -20973 0
 20969  20970  20971  770  20974 0

c  -1-1 --> -2
c    ( b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧  b^{154, 5}_0 ∧ -p_770) -> ( b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0)
c  in CNF:
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨  b^{154, 6}_2
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨  b^{154, 6}_1
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨  p_770 ∨ -b^{154, 6}_0
c  in DIMACS:
-20969  20970 -20971  770  20972 0
-20969  20970 -20971  770  20973 0
-20969  20970 -20971  770 -20974 0

c  -2-1 --> break 
c    ( b^{154, 5}_2 ∧  b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨  b^{154, 5}_0 ∨  p_770 ∨ break
c  in DIMACS:
-20969 -20970  20971  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 5}_2 ∧ -b^{154, 5}_1 ∧ -b^{154, 5}_0 ∧ true) 
c  in CNF:
c    -b^{154, 5}_2 ∨  b^{154, 5}_1 ∨  b^{154, 5}_0 ∨ false 
c  in DIMACS:
-20969  20970  20971  0

c  3 does not represent an automaton state.
c    -(-b^{154, 5}_2 ∧  b^{154, 5}_1 ∧  b^{154, 5}_0 ∧ true) 
c  in CNF:
c     b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ false 
c  in DIMACS:
 20969 -20970 -20971  0
c  -3 does not represent an automaton state.
c    -( b^{154, 5}_2 ∧  b^{154, 5}_1 ∧  b^{154, 5}_0 ∧ true) 
c  in CNF:
c    -b^{154, 5}_2 ∨ -b^{154, 5}_1 ∨ -b^{154, 5}_0 ∨ false 
c  in DIMACS:
-20969 -20970 -20971  0

c i = 6
c  -2+1 --> -1
c    ( b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧  p_924) -> ( b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0)
c  in CNF:
c    -b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨  b^{154, 7}_2
c    -b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_1
c    -b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨  b^{154, 7}_0
c  in DIMACS:
-20972 -20973  20974 -924  20975 0
-20972 -20973  20974 -924 -20976 0
-20972 -20973  20974 -924  20977 0

c  -1+1 --> 0
c    ( b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0 ∧  p_924) -> (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧ -b^{154, 7}_0)
c  in CNF:
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_2
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_1
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_0
c  in DIMACS:
-20972  20973 -20974 -924 -20975 0
-20972  20973 -20974 -924 -20976 0
-20972  20973 -20974 -924 -20977 0

c  0+1 --> 1
c    (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧  p_924) -> (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0)
c  in CNF:
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_2
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_1
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨  b^{154, 7}_0
c  in DIMACS:
 20972  20973  20974 -924 -20975 0
 20972  20973  20974 -924 -20976 0
 20972  20973  20974 -924  20977 0

c  1+1 --> 2
c    (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0 ∧  p_924) -> (-b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0)
c  in CNF:
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_2
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨  b^{154, 7}_1
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ -p_924 ∨ -b^{154, 7}_0
c  in DIMACS:
 20972  20973 -20974 -924 -20975 0
 20972  20973 -20974 -924  20976 0
 20972  20973 -20974 -924 -20977 0

c  2+1 --> break 
c    (-b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧  p_924) -> break
c  in CNF:
c     b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 20972 -20973  20974 -924 1162 0


c  2-1 --> 1
c    (-b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧ -p_924) -> (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0)
c  in CNF:
c     b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_2
c     b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_1
c     b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨  b^{154, 7}_0
c  in DIMACS:
 20972 -20973  20974  924 -20975 0
 20972 -20973  20974  924 -20976 0
 20972 -20973  20974  924  20977 0

c  1-1 --> 0
c    (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0 ∧ -p_924) -> (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧ -b^{154, 7}_0)
c  in CNF:
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_2
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_1
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_0
c  in DIMACS:
 20972  20973 -20974  924 -20975 0
 20972  20973 -20974  924 -20976 0
 20972  20973 -20974  924 -20977 0

c  0-1 --> -1
c    (-b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧ -p_924) -> ( b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0)
c  in CNF:
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨  b^{154, 7}_2
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_1
c     b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨  b^{154, 7}_0
c  in DIMACS:
 20972  20973  20974  924  20975 0
 20972  20973  20974  924 -20976 0
 20972  20973  20974  924  20977 0

c  -1-1 --> -2
c    ( b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧  b^{154, 6}_0 ∧ -p_924) -> ( b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0)
c  in CNF:
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨  b^{154, 7}_2
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨  b^{154, 7}_1
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨  p_924 ∨ -b^{154, 7}_0
c  in DIMACS:
-20972  20973 -20974  924  20975 0
-20972  20973 -20974  924  20976 0
-20972  20973 -20974  924 -20977 0

c  -2-1 --> break 
c    ( b^{154, 6}_2 ∧  b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨  b^{154, 6}_0 ∨  p_924 ∨ break
c  in DIMACS:
-20972 -20973  20974  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 6}_2 ∧ -b^{154, 6}_1 ∧ -b^{154, 6}_0 ∧ true) 
c  in CNF:
c    -b^{154, 6}_2 ∨  b^{154, 6}_1 ∨  b^{154, 6}_0 ∨ false 
c  in DIMACS:
-20972  20973  20974  0

c  3 does not represent an automaton state.
c    -(-b^{154, 6}_2 ∧  b^{154, 6}_1 ∧  b^{154, 6}_0 ∧ true) 
c  in CNF:
c     b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ false 
c  in DIMACS:
 20972 -20973 -20974  0
c  -3 does not represent an automaton state.
c    -( b^{154, 6}_2 ∧  b^{154, 6}_1 ∧  b^{154, 6}_0 ∧ true) 
c  in CNF:
c    -b^{154, 6}_2 ∨ -b^{154, 6}_1 ∨ -b^{154, 6}_0 ∨ false 
c  in DIMACS:
-20972 -20973 -20974  0

c i = 7
c  -2+1 --> -1
c    ( b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧  p_1078) -> ( b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧  b^{154, 8}_0)
c  in CNF:
c    -b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨  b^{154, 8}_2
c    -b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_1
c    -b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨  b^{154, 8}_0
c  in DIMACS:
-20975 -20976  20977 -1078  20978 0
-20975 -20976  20977 -1078 -20979 0
-20975 -20976  20977 -1078  20980 0

c  -1+1 --> 0
c    ( b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0 ∧  p_1078) -> (-b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧ -b^{154, 8}_0)
c  in CNF:
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_2
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_1
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_0
c  in DIMACS:
-20975  20976 -20977 -1078 -20978 0
-20975  20976 -20977 -1078 -20979 0
-20975  20976 -20977 -1078 -20980 0

c  0+1 --> 1
c    (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧  p_1078) -> (-b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧  b^{154, 8}_0)
c  in CNF:
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_2
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_1
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨  b^{154, 8}_0
c  in DIMACS:
 20975  20976  20977 -1078 -20978 0
 20975  20976  20977 -1078 -20979 0
 20975  20976  20977 -1078  20980 0

c  1+1 --> 2
c    (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0 ∧  p_1078) -> (-b^{154, 8}_2 ∧  b^{154, 8}_1 ∧ -b^{154, 8}_0)
c  in CNF:
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_2
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨  b^{154, 8}_1
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ -p_1078 ∨ -b^{154, 8}_0
c  in DIMACS:
 20975  20976 -20977 -1078 -20978 0
 20975  20976 -20977 -1078  20979 0
 20975  20976 -20977 -1078 -20980 0

c  2+1 --> break 
c    (-b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧  p_1078) -> break
c  in CNF:
c     b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ -p_1078 ∨ break
c  in DIMACS:
 20975 -20976  20977 -1078 1162 0


c  2-1 --> 1
c    (-b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧ -p_1078) -> (-b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧  b^{154, 8}_0)
c  in CNF:
c     b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_2
c     b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_1
c     b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨  b^{154, 8}_0
c  in DIMACS:
 20975 -20976  20977  1078 -20978 0
 20975 -20976  20977  1078 -20979 0
 20975 -20976  20977  1078  20980 0

c  1-1 --> 0
c    (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0 ∧ -p_1078) -> (-b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧ -b^{154, 8}_0)
c  in CNF:
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_2
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_1
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_0
c  in DIMACS:
 20975  20976 -20977  1078 -20978 0
 20975  20976 -20977  1078 -20979 0
 20975  20976 -20977  1078 -20980 0

c  0-1 --> -1
c    (-b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧ -p_1078) -> ( b^{154, 8}_2 ∧ -b^{154, 8}_1 ∧  b^{154, 8}_0)
c  in CNF:
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨  b^{154, 8}_2
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_1
c     b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨  b^{154, 8}_0
c  in DIMACS:
 20975  20976  20977  1078  20978 0
 20975  20976  20977  1078 -20979 0
 20975  20976  20977  1078  20980 0

c  -1-1 --> -2
c    ( b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧  b^{154, 7}_0 ∧ -p_1078) -> ( b^{154, 8}_2 ∧  b^{154, 8}_1 ∧ -b^{154, 8}_0)
c  in CNF:
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨  b^{154, 8}_2
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨  b^{154, 8}_1
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨  p_1078 ∨ -b^{154, 8}_0
c  in DIMACS:
-20975  20976 -20977  1078  20978 0
-20975  20976 -20977  1078  20979 0
-20975  20976 -20977  1078 -20980 0

c  -2-1 --> break 
c    ( b^{154, 7}_2 ∧  b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧ -p_1078) -> break
c  in CNF:
c    -b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨  b^{154, 7}_0 ∨  p_1078 ∨ break
c  in DIMACS:
-20975 -20976  20977  1078 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{154, 7}_2 ∧ -b^{154, 7}_1 ∧ -b^{154, 7}_0 ∧ true) 
c  in CNF:
c    -b^{154, 7}_2 ∨  b^{154, 7}_1 ∨  b^{154, 7}_0 ∨ false 
c  in DIMACS:
-20975  20976  20977  0

c  3 does not represent an automaton state.
c    -(-b^{154, 7}_2 ∧  b^{154, 7}_1 ∧  b^{154, 7}_0 ∧ true) 
c  in CNF:
c     b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ false 
c  in DIMACS:
 20975 -20976 -20977  0
c  -3 does not represent an automaton state.
c    -( b^{154, 7}_2 ∧  b^{154, 7}_1 ∧  b^{154, 7}_0 ∧ true) 
c  in CNF:
c    -b^{154, 7}_2 ∨ -b^{154, 7}_1 ∨ -b^{154, 7}_0 ∨ false 
c  in DIMACS:
-20975 -20976 -20977  0

c INIT for k = 155
c    -b^{155, 1}_2
c    -b^{155, 1}_1
c    -b^{155, 1}_0
c  in DIMACS:
-20981 0
-20982 0
-20983 0

c Transitions for k = 155
c i = 1
c  -2+1 --> -1
c    ( b^{155, 1}_2 ∧  b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧  p_155) -> ( b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0)
c  in CNF:
c    -b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨  b^{155, 2}_2
c    -b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_1
c    -b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨  b^{155, 2}_0
c  in DIMACS:
-20981 -20982  20983 -155  20984 0
-20981 -20982  20983 -155 -20985 0
-20981 -20982  20983 -155  20986 0

c  -1+1 --> 0
c    ( b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧  b^{155, 1}_0 ∧  p_155) -> (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧ -b^{155, 2}_0)
c  in CNF:
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_2
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_1
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_0
c  in DIMACS:
-20981  20982 -20983 -155 -20984 0
-20981  20982 -20983 -155 -20985 0
-20981  20982 -20983 -155 -20986 0

c  0+1 --> 1
c    (-b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧  p_155) -> (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0)
c  in CNF:
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_2
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_1
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨  b^{155, 2}_0
c  in DIMACS:
 20981  20982  20983 -155 -20984 0
 20981  20982  20983 -155 -20985 0
 20981  20982  20983 -155  20986 0

c  1+1 --> 2
c    (-b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧  b^{155, 1}_0 ∧  p_155) -> (-b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0)
c  in CNF:
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_2
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨  b^{155, 2}_1
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ -p_155 ∨ -b^{155, 2}_0
c  in DIMACS:
 20981  20982 -20983 -155 -20984 0
 20981  20982 -20983 -155  20985 0
 20981  20982 -20983 -155 -20986 0

c  2+1 --> break 
c    (-b^{155, 1}_2 ∧  b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧  p_155) -> break
c  in CNF:
c     b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ -p_155 ∨ break
c  in DIMACS:
 20981 -20982  20983 -155 1162 0


c  2-1 --> 1
c    (-b^{155, 1}_2 ∧  b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧ -p_155) -> (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0)
c  in CNF:
c     b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_2
c     b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_1
c     b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨  b^{155, 2}_0
c  in DIMACS:
 20981 -20982  20983  155 -20984 0
 20981 -20982  20983  155 -20985 0
 20981 -20982  20983  155  20986 0

c  1-1 --> 0
c    (-b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧  b^{155, 1}_0 ∧ -p_155) -> (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧ -b^{155, 2}_0)
c  in CNF:
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_2
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_1
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_0
c  in DIMACS:
 20981  20982 -20983  155 -20984 0
 20981  20982 -20983  155 -20985 0
 20981  20982 -20983  155 -20986 0

c  0-1 --> -1
c    (-b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧ -p_155) -> ( b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0)
c  in CNF:
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨  b^{155, 2}_2
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_1
c     b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨  b^{155, 2}_0
c  in DIMACS:
 20981  20982  20983  155  20984 0
 20981  20982  20983  155 -20985 0
 20981  20982  20983  155  20986 0

c  -1-1 --> -2
c    ( b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧  b^{155, 1}_0 ∧ -p_155) -> ( b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0)
c  in CNF:
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨  b^{155, 2}_2
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨  b^{155, 2}_1
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨  p_155 ∨ -b^{155, 2}_0
c  in DIMACS:
-20981  20982 -20983  155  20984 0
-20981  20982 -20983  155  20985 0
-20981  20982 -20983  155 -20986 0

c  -2-1 --> break 
c    ( b^{155, 1}_2 ∧  b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧ -p_155) -> break
c  in CNF:
c    -b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨  b^{155, 1}_0 ∨  p_155 ∨ break
c  in DIMACS:
-20981 -20982  20983  155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 1}_2 ∧ -b^{155, 1}_1 ∧ -b^{155, 1}_0 ∧ true) 
c  in CNF:
c    -b^{155, 1}_2 ∨  b^{155, 1}_1 ∨  b^{155, 1}_0 ∨ false 
c  in DIMACS:
-20981  20982  20983  0

c  3 does not represent an automaton state.
c    -(-b^{155, 1}_2 ∧  b^{155, 1}_1 ∧  b^{155, 1}_0 ∧ true) 
c  in CNF:
c     b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ false 
c  in DIMACS:
 20981 -20982 -20983  0
c  -3 does not represent an automaton state.
c    -( b^{155, 1}_2 ∧  b^{155, 1}_1 ∧  b^{155, 1}_0 ∧ true) 
c  in CNF:
c    -b^{155, 1}_2 ∨ -b^{155, 1}_1 ∨ -b^{155, 1}_0 ∨ false 
c  in DIMACS:
-20981 -20982 -20983  0

c i = 2
c  -2+1 --> -1
c    ( b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧  p_310) -> ( b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0)
c  in CNF:
c    -b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨  b^{155, 3}_2
c    -b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_1
c    -b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨  b^{155, 3}_0
c  in DIMACS:
-20984 -20985  20986 -310  20987 0
-20984 -20985  20986 -310 -20988 0
-20984 -20985  20986 -310  20989 0

c  -1+1 --> 0
c    ( b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0 ∧  p_310) -> (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧ -b^{155, 3}_0)
c  in CNF:
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_2
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_1
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_0
c  in DIMACS:
-20984  20985 -20986 -310 -20987 0
-20984  20985 -20986 -310 -20988 0
-20984  20985 -20986 -310 -20989 0

c  0+1 --> 1
c    (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧  p_310) -> (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0)
c  in CNF:
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_2
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_1
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨  b^{155, 3}_0
c  in DIMACS:
 20984  20985  20986 -310 -20987 0
 20984  20985  20986 -310 -20988 0
 20984  20985  20986 -310  20989 0

c  1+1 --> 2
c    (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0 ∧  p_310) -> (-b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0)
c  in CNF:
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_2
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨  b^{155, 3}_1
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ -p_310 ∨ -b^{155, 3}_0
c  in DIMACS:
 20984  20985 -20986 -310 -20987 0
 20984  20985 -20986 -310  20988 0
 20984  20985 -20986 -310 -20989 0

c  2+1 --> break 
c    (-b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧  p_310) -> break
c  in CNF:
c     b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 20984 -20985  20986 -310 1162 0


c  2-1 --> 1
c    (-b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧ -p_310) -> (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0)
c  in CNF:
c     b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_2
c     b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_1
c     b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨  b^{155, 3}_0
c  in DIMACS:
 20984 -20985  20986  310 -20987 0
 20984 -20985  20986  310 -20988 0
 20984 -20985  20986  310  20989 0

c  1-1 --> 0
c    (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0 ∧ -p_310) -> (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧ -b^{155, 3}_0)
c  in CNF:
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_2
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_1
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_0
c  in DIMACS:
 20984  20985 -20986  310 -20987 0
 20984  20985 -20986  310 -20988 0
 20984  20985 -20986  310 -20989 0

c  0-1 --> -1
c    (-b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧ -p_310) -> ( b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0)
c  in CNF:
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨  b^{155, 3}_2
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_1
c     b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨  b^{155, 3}_0
c  in DIMACS:
 20984  20985  20986  310  20987 0
 20984  20985  20986  310 -20988 0
 20984  20985  20986  310  20989 0

c  -1-1 --> -2
c    ( b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧  b^{155, 2}_0 ∧ -p_310) -> ( b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0)
c  in CNF:
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨  b^{155, 3}_2
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨  b^{155, 3}_1
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨  p_310 ∨ -b^{155, 3}_0
c  in DIMACS:
-20984  20985 -20986  310  20987 0
-20984  20985 -20986  310  20988 0
-20984  20985 -20986  310 -20989 0

c  -2-1 --> break 
c    ( b^{155, 2}_2 ∧  b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨  b^{155, 2}_0 ∨  p_310 ∨ break
c  in DIMACS:
-20984 -20985  20986  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 2}_2 ∧ -b^{155, 2}_1 ∧ -b^{155, 2}_0 ∧ true) 
c  in CNF:
c    -b^{155, 2}_2 ∨  b^{155, 2}_1 ∨  b^{155, 2}_0 ∨ false 
c  in DIMACS:
-20984  20985  20986  0

c  3 does not represent an automaton state.
c    -(-b^{155, 2}_2 ∧  b^{155, 2}_1 ∧  b^{155, 2}_0 ∧ true) 
c  in CNF:
c     b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ false 
c  in DIMACS:
 20984 -20985 -20986  0
c  -3 does not represent an automaton state.
c    -( b^{155, 2}_2 ∧  b^{155, 2}_1 ∧  b^{155, 2}_0 ∧ true) 
c  in CNF:
c    -b^{155, 2}_2 ∨ -b^{155, 2}_1 ∨ -b^{155, 2}_0 ∨ false 
c  in DIMACS:
-20984 -20985 -20986  0

c i = 3
c  -2+1 --> -1
c    ( b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧  p_465) -> ( b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0)
c  in CNF:
c    -b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨  b^{155, 4}_2
c    -b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_1
c    -b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨  b^{155, 4}_0
c  in DIMACS:
-20987 -20988  20989 -465  20990 0
-20987 -20988  20989 -465 -20991 0
-20987 -20988  20989 -465  20992 0

c  -1+1 --> 0
c    ( b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0 ∧  p_465) -> (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧ -b^{155, 4}_0)
c  in CNF:
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_2
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_1
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_0
c  in DIMACS:
-20987  20988 -20989 -465 -20990 0
-20987  20988 -20989 -465 -20991 0
-20987  20988 -20989 -465 -20992 0

c  0+1 --> 1
c    (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧  p_465) -> (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0)
c  in CNF:
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_2
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_1
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨  b^{155, 4}_0
c  in DIMACS:
 20987  20988  20989 -465 -20990 0
 20987  20988  20989 -465 -20991 0
 20987  20988  20989 -465  20992 0

c  1+1 --> 2
c    (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0 ∧  p_465) -> (-b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0)
c  in CNF:
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_2
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨  b^{155, 4}_1
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ -p_465 ∨ -b^{155, 4}_0
c  in DIMACS:
 20987  20988 -20989 -465 -20990 0
 20987  20988 -20989 -465  20991 0
 20987  20988 -20989 -465 -20992 0

c  2+1 --> break 
c    (-b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧  p_465) -> break
c  in CNF:
c     b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ -p_465 ∨ break
c  in DIMACS:
 20987 -20988  20989 -465 1162 0


c  2-1 --> 1
c    (-b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧ -p_465) -> (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0)
c  in CNF:
c     b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_2
c     b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_1
c     b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨  b^{155, 4}_0
c  in DIMACS:
 20987 -20988  20989  465 -20990 0
 20987 -20988  20989  465 -20991 0
 20987 -20988  20989  465  20992 0

c  1-1 --> 0
c    (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0 ∧ -p_465) -> (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧ -b^{155, 4}_0)
c  in CNF:
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_2
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_1
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_0
c  in DIMACS:
 20987  20988 -20989  465 -20990 0
 20987  20988 -20989  465 -20991 0
 20987  20988 -20989  465 -20992 0

c  0-1 --> -1
c    (-b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧ -p_465) -> ( b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0)
c  in CNF:
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨  b^{155, 4}_2
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_1
c     b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨  b^{155, 4}_0
c  in DIMACS:
 20987  20988  20989  465  20990 0
 20987  20988  20989  465 -20991 0
 20987  20988  20989  465  20992 0

c  -1-1 --> -2
c    ( b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧  b^{155, 3}_0 ∧ -p_465) -> ( b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0)
c  in CNF:
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨  b^{155, 4}_2
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨  b^{155, 4}_1
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨  p_465 ∨ -b^{155, 4}_0
c  in DIMACS:
-20987  20988 -20989  465  20990 0
-20987  20988 -20989  465  20991 0
-20987  20988 -20989  465 -20992 0

c  -2-1 --> break 
c    ( b^{155, 3}_2 ∧  b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧ -p_465) -> break
c  in CNF:
c    -b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨  b^{155, 3}_0 ∨  p_465 ∨ break
c  in DIMACS:
-20987 -20988  20989  465 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 3}_2 ∧ -b^{155, 3}_1 ∧ -b^{155, 3}_0 ∧ true) 
c  in CNF:
c    -b^{155, 3}_2 ∨  b^{155, 3}_1 ∨  b^{155, 3}_0 ∨ false 
c  in DIMACS:
-20987  20988  20989  0

c  3 does not represent an automaton state.
c    -(-b^{155, 3}_2 ∧  b^{155, 3}_1 ∧  b^{155, 3}_0 ∧ true) 
c  in CNF:
c     b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ false 
c  in DIMACS:
 20987 -20988 -20989  0
c  -3 does not represent an automaton state.
c    -( b^{155, 3}_2 ∧  b^{155, 3}_1 ∧  b^{155, 3}_0 ∧ true) 
c  in CNF:
c    -b^{155, 3}_2 ∨ -b^{155, 3}_1 ∨ -b^{155, 3}_0 ∨ false 
c  in DIMACS:
-20987 -20988 -20989  0

c i = 4
c  -2+1 --> -1
c    ( b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧  p_620) -> ( b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0)
c  in CNF:
c    -b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨  b^{155, 5}_2
c    -b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_1
c    -b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨  b^{155, 5}_0
c  in DIMACS:
-20990 -20991  20992 -620  20993 0
-20990 -20991  20992 -620 -20994 0
-20990 -20991  20992 -620  20995 0

c  -1+1 --> 0
c    ( b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0 ∧  p_620) -> (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧ -b^{155, 5}_0)
c  in CNF:
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_2
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_1
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_0
c  in DIMACS:
-20990  20991 -20992 -620 -20993 0
-20990  20991 -20992 -620 -20994 0
-20990  20991 -20992 -620 -20995 0

c  0+1 --> 1
c    (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧  p_620) -> (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0)
c  in CNF:
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_2
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_1
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨  b^{155, 5}_0
c  in DIMACS:
 20990  20991  20992 -620 -20993 0
 20990  20991  20992 -620 -20994 0
 20990  20991  20992 -620  20995 0

c  1+1 --> 2
c    (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0 ∧  p_620) -> (-b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0)
c  in CNF:
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_2
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨  b^{155, 5}_1
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ -p_620 ∨ -b^{155, 5}_0
c  in DIMACS:
 20990  20991 -20992 -620 -20993 0
 20990  20991 -20992 -620  20994 0
 20990  20991 -20992 -620 -20995 0

c  2+1 --> break 
c    (-b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧  p_620) -> break
c  in CNF:
c     b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 20990 -20991  20992 -620 1162 0


c  2-1 --> 1
c    (-b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧ -p_620) -> (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0)
c  in CNF:
c     b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_2
c     b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_1
c     b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨  b^{155, 5}_0
c  in DIMACS:
 20990 -20991  20992  620 -20993 0
 20990 -20991  20992  620 -20994 0
 20990 -20991  20992  620  20995 0

c  1-1 --> 0
c    (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0 ∧ -p_620) -> (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧ -b^{155, 5}_0)
c  in CNF:
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_2
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_1
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_0
c  in DIMACS:
 20990  20991 -20992  620 -20993 0
 20990  20991 -20992  620 -20994 0
 20990  20991 -20992  620 -20995 0

c  0-1 --> -1
c    (-b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧ -p_620) -> ( b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0)
c  in CNF:
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨  b^{155, 5}_2
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_1
c     b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨  b^{155, 5}_0
c  in DIMACS:
 20990  20991  20992  620  20993 0
 20990  20991  20992  620 -20994 0
 20990  20991  20992  620  20995 0

c  -1-1 --> -2
c    ( b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧  b^{155, 4}_0 ∧ -p_620) -> ( b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0)
c  in CNF:
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨  b^{155, 5}_2
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨  b^{155, 5}_1
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨  p_620 ∨ -b^{155, 5}_0
c  in DIMACS:
-20990  20991 -20992  620  20993 0
-20990  20991 -20992  620  20994 0
-20990  20991 -20992  620 -20995 0

c  -2-1 --> break 
c    ( b^{155, 4}_2 ∧  b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨  b^{155, 4}_0 ∨  p_620 ∨ break
c  in DIMACS:
-20990 -20991  20992  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 4}_2 ∧ -b^{155, 4}_1 ∧ -b^{155, 4}_0 ∧ true) 
c  in CNF:
c    -b^{155, 4}_2 ∨  b^{155, 4}_1 ∨  b^{155, 4}_0 ∨ false 
c  in DIMACS:
-20990  20991  20992  0

c  3 does not represent an automaton state.
c    -(-b^{155, 4}_2 ∧  b^{155, 4}_1 ∧  b^{155, 4}_0 ∧ true) 
c  in CNF:
c     b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ false 
c  in DIMACS:
 20990 -20991 -20992  0
c  -3 does not represent an automaton state.
c    -( b^{155, 4}_2 ∧  b^{155, 4}_1 ∧  b^{155, 4}_0 ∧ true) 
c  in CNF:
c    -b^{155, 4}_2 ∨ -b^{155, 4}_1 ∨ -b^{155, 4}_0 ∨ false 
c  in DIMACS:
-20990 -20991 -20992  0

c i = 5
c  -2+1 --> -1
c    ( b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧  p_775) -> ( b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0)
c  in CNF:
c    -b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨  b^{155, 6}_2
c    -b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_1
c    -b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨  b^{155, 6}_0
c  in DIMACS:
-20993 -20994  20995 -775  20996 0
-20993 -20994  20995 -775 -20997 0
-20993 -20994  20995 -775  20998 0

c  -1+1 --> 0
c    ( b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0 ∧  p_775) -> (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧ -b^{155, 6}_0)
c  in CNF:
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_2
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_1
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_0
c  in DIMACS:
-20993  20994 -20995 -775 -20996 0
-20993  20994 -20995 -775 -20997 0
-20993  20994 -20995 -775 -20998 0

c  0+1 --> 1
c    (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧  p_775) -> (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0)
c  in CNF:
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_2
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_1
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨  b^{155, 6}_0
c  in DIMACS:
 20993  20994  20995 -775 -20996 0
 20993  20994  20995 -775 -20997 0
 20993  20994  20995 -775  20998 0

c  1+1 --> 2
c    (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0 ∧  p_775) -> (-b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0)
c  in CNF:
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_2
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨  b^{155, 6}_1
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ -p_775 ∨ -b^{155, 6}_0
c  in DIMACS:
 20993  20994 -20995 -775 -20996 0
 20993  20994 -20995 -775  20997 0
 20993  20994 -20995 -775 -20998 0

c  2+1 --> break 
c    (-b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧  p_775) -> break
c  in CNF:
c     b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ -p_775 ∨ break
c  in DIMACS:
 20993 -20994  20995 -775 1162 0


c  2-1 --> 1
c    (-b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧ -p_775) -> (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0)
c  in CNF:
c     b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_2
c     b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_1
c     b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨  b^{155, 6}_0
c  in DIMACS:
 20993 -20994  20995  775 -20996 0
 20993 -20994  20995  775 -20997 0
 20993 -20994  20995  775  20998 0

c  1-1 --> 0
c    (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0 ∧ -p_775) -> (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧ -b^{155, 6}_0)
c  in CNF:
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_2
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_1
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_0
c  in DIMACS:
 20993  20994 -20995  775 -20996 0
 20993  20994 -20995  775 -20997 0
 20993  20994 -20995  775 -20998 0

c  0-1 --> -1
c    (-b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧ -p_775) -> ( b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0)
c  in CNF:
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨  b^{155, 6}_2
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_1
c     b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨  b^{155, 6}_0
c  in DIMACS:
 20993  20994  20995  775  20996 0
 20993  20994  20995  775 -20997 0
 20993  20994  20995  775  20998 0

c  -1-1 --> -2
c    ( b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧  b^{155, 5}_0 ∧ -p_775) -> ( b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0)
c  in CNF:
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨  b^{155, 6}_2
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨  b^{155, 6}_1
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨  p_775 ∨ -b^{155, 6}_0
c  in DIMACS:
-20993  20994 -20995  775  20996 0
-20993  20994 -20995  775  20997 0
-20993  20994 -20995  775 -20998 0

c  -2-1 --> break 
c    ( b^{155, 5}_2 ∧  b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧ -p_775) -> break
c  in CNF:
c    -b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨  b^{155, 5}_0 ∨  p_775 ∨ break
c  in DIMACS:
-20993 -20994  20995  775 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 5}_2 ∧ -b^{155, 5}_1 ∧ -b^{155, 5}_0 ∧ true) 
c  in CNF:
c    -b^{155, 5}_2 ∨  b^{155, 5}_1 ∨  b^{155, 5}_0 ∨ false 
c  in DIMACS:
-20993  20994  20995  0

c  3 does not represent an automaton state.
c    -(-b^{155, 5}_2 ∧  b^{155, 5}_1 ∧  b^{155, 5}_0 ∧ true) 
c  in CNF:
c     b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ false 
c  in DIMACS:
 20993 -20994 -20995  0
c  -3 does not represent an automaton state.
c    -( b^{155, 5}_2 ∧  b^{155, 5}_1 ∧  b^{155, 5}_0 ∧ true) 
c  in CNF:
c    -b^{155, 5}_2 ∨ -b^{155, 5}_1 ∨ -b^{155, 5}_0 ∨ false 
c  in DIMACS:
-20993 -20994 -20995  0

c i = 6
c  -2+1 --> -1
c    ( b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧  p_930) -> ( b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0)
c  in CNF:
c    -b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨  b^{155, 7}_2
c    -b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_1
c    -b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨  b^{155, 7}_0
c  in DIMACS:
-20996 -20997  20998 -930  20999 0
-20996 -20997  20998 -930 -21000 0
-20996 -20997  20998 -930  21001 0

c  -1+1 --> 0
c    ( b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0 ∧  p_930) -> (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧ -b^{155, 7}_0)
c  in CNF:
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_2
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_1
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_0
c  in DIMACS:
-20996  20997 -20998 -930 -20999 0
-20996  20997 -20998 -930 -21000 0
-20996  20997 -20998 -930 -21001 0

c  0+1 --> 1
c    (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧  p_930) -> (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0)
c  in CNF:
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_2
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_1
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨  b^{155, 7}_0
c  in DIMACS:
 20996  20997  20998 -930 -20999 0
 20996  20997  20998 -930 -21000 0
 20996  20997  20998 -930  21001 0

c  1+1 --> 2
c    (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0 ∧  p_930) -> (-b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0)
c  in CNF:
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_2
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨  b^{155, 7}_1
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ -p_930 ∨ -b^{155, 7}_0
c  in DIMACS:
 20996  20997 -20998 -930 -20999 0
 20996  20997 -20998 -930  21000 0
 20996  20997 -20998 -930 -21001 0

c  2+1 --> break 
c    (-b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧  p_930) -> break
c  in CNF:
c     b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 20996 -20997  20998 -930 1162 0


c  2-1 --> 1
c    (-b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧ -p_930) -> (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0)
c  in CNF:
c     b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_2
c     b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_1
c     b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨  b^{155, 7}_0
c  in DIMACS:
 20996 -20997  20998  930 -20999 0
 20996 -20997  20998  930 -21000 0
 20996 -20997  20998  930  21001 0

c  1-1 --> 0
c    (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0 ∧ -p_930) -> (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧ -b^{155, 7}_0)
c  in CNF:
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_2
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_1
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_0
c  in DIMACS:
 20996  20997 -20998  930 -20999 0
 20996  20997 -20998  930 -21000 0
 20996  20997 -20998  930 -21001 0

c  0-1 --> -1
c    (-b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧ -p_930) -> ( b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0)
c  in CNF:
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨  b^{155, 7}_2
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_1
c     b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨  b^{155, 7}_0
c  in DIMACS:
 20996  20997  20998  930  20999 0
 20996  20997  20998  930 -21000 0
 20996  20997  20998  930  21001 0

c  -1-1 --> -2
c    ( b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧  b^{155, 6}_0 ∧ -p_930) -> ( b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0)
c  in CNF:
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨  b^{155, 7}_2
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨  b^{155, 7}_1
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨  p_930 ∨ -b^{155, 7}_0
c  in DIMACS:
-20996  20997 -20998  930  20999 0
-20996  20997 -20998  930  21000 0
-20996  20997 -20998  930 -21001 0

c  -2-1 --> break 
c    ( b^{155, 6}_2 ∧  b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨  b^{155, 6}_0 ∨  p_930 ∨ break
c  in DIMACS:
-20996 -20997  20998  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 6}_2 ∧ -b^{155, 6}_1 ∧ -b^{155, 6}_0 ∧ true) 
c  in CNF:
c    -b^{155, 6}_2 ∨  b^{155, 6}_1 ∨  b^{155, 6}_0 ∨ false 
c  in DIMACS:
-20996  20997  20998  0

c  3 does not represent an automaton state.
c    -(-b^{155, 6}_2 ∧  b^{155, 6}_1 ∧  b^{155, 6}_0 ∧ true) 
c  in CNF:
c     b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ false 
c  in DIMACS:
 20996 -20997 -20998  0
c  -3 does not represent an automaton state.
c    -( b^{155, 6}_2 ∧  b^{155, 6}_1 ∧  b^{155, 6}_0 ∧ true) 
c  in CNF:
c    -b^{155, 6}_2 ∨ -b^{155, 6}_1 ∨ -b^{155, 6}_0 ∨ false 
c  in DIMACS:
-20996 -20997 -20998  0

c i = 7
c  -2+1 --> -1
c    ( b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧  p_1085) -> ( b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧  b^{155, 8}_0)
c  in CNF:
c    -b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨  b^{155, 8}_2
c    -b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_1
c    -b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨  b^{155, 8}_0
c  in DIMACS:
-20999 -21000  21001 -1085  21002 0
-20999 -21000  21001 -1085 -21003 0
-20999 -21000  21001 -1085  21004 0

c  -1+1 --> 0
c    ( b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0 ∧  p_1085) -> (-b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧ -b^{155, 8}_0)
c  in CNF:
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_2
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_1
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_0
c  in DIMACS:
-20999  21000 -21001 -1085 -21002 0
-20999  21000 -21001 -1085 -21003 0
-20999  21000 -21001 -1085 -21004 0

c  0+1 --> 1
c    (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧  p_1085) -> (-b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧  b^{155, 8}_0)
c  in CNF:
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_2
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_1
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨  b^{155, 8}_0
c  in DIMACS:
 20999  21000  21001 -1085 -21002 0
 20999  21000  21001 -1085 -21003 0
 20999  21000  21001 -1085  21004 0

c  1+1 --> 2
c    (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0 ∧  p_1085) -> (-b^{155, 8}_2 ∧  b^{155, 8}_1 ∧ -b^{155, 8}_0)
c  in CNF:
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_2
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨  b^{155, 8}_1
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ -p_1085 ∨ -b^{155, 8}_0
c  in DIMACS:
 20999  21000 -21001 -1085 -21002 0
 20999  21000 -21001 -1085  21003 0
 20999  21000 -21001 -1085 -21004 0

c  2+1 --> break 
c    (-b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 20999 -21000  21001 -1085 1162 0


c  2-1 --> 1
c    (-b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧ -p_1085) -> (-b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧  b^{155, 8}_0)
c  in CNF:
c     b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_2
c     b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_1
c     b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨  b^{155, 8}_0
c  in DIMACS:
 20999 -21000  21001  1085 -21002 0
 20999 -21000  21001  1085 -21003 0
 20999 -21000  21001  1085  21004 0

c  1-1 --> 0
c    (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0 ∧ -p_1085) -> (-b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧ -b^{155, 8}_0)
c  in CNF:
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_2
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_1
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_0
c  in DIMACS:
 20999  21000 -21001  1085 -21002 0
 20999  21000 -21001  1085 -21003 0
 20999  21000 -21001  1085 -21004 0

c  0-1 --> -1
c    (-b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧ -p_1085) -> ( b^{155, 8}_2 ∧ -b^{155, 8}_1 ∧  b^{155, 8}_0)
c  in CNF:
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨  b^{155, 8}_2
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_1
c     b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨  b^{155, 8}_0
c  in DIMACS:
 20999  21000  21001  1085  21002 0
 20999  21000  21001  1085 -21003 0
 20999  21000  21001  1085  21004 0

c  -1-1 --> -2
c    ( b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧  b^{155, 7}_0 ∧ -p_1085) -> ( b^{155, 8}_2 ∧  b^{155, 8}_1 ∧ -b^{155, 8}_0)
c  in CNF:
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨  b^{155, 8}_2
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨  b^{155, 8}_1
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨  p_1085 ∨ -b^{155, 8}_0
c  in DIMACS:
-20999  21000 -21001  1085  21002 0
-20999  21000 -21001  1085  21003 0
-20999  21000 -21001  1085 -21004 0

c  -2-1 --> break 
c    ( b^{155, 7}_2 ∧  b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨  b^{155, 7}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-20999 -21000  21001  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{155, 7}_2 ∧ -b^{155, 7}_1 ∧ -b^{155, 7}_0 ∧ true) 
c  in CNF:
c    -b^{155, 7}_2 ∨  b^{155, 7}_1 ∨  b^{155, 7}_0 ∨ false 
c  in DIMACS:
-20999  21000  21001  0

c  3 does not represent an automaton state.
c    -(-b^{155, 7}_2 ∧  b^{155, 7}_1 ∧  b^{155, 7}_0 ∧ true) 
c  in CNF:
c     b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ false 
c  in DIMACS:
 20999 -21000 -21001  0
c  -3 does not represent an automaton state.
c    -( b^{155, 7}_2 ∧  b^{155, 7}_1 ∧  b^{155, 7}_0 ∧ true) 
c  in CNF:
c    -b^{155, 7}_2 ∨ -b^{155, 7}_1 ∨ -b^{155, 7}_0 ∨ false 
c  in DIMACS:
-20999 -21000 -21001  0

c INIT for k = 156
c    -b^{156, 1}_2
c    -b^{156, 1}_1
c    -b^{156, 1}_0
c  in DIMACS:
-21005 0
-21006 0
-21007 0

c Transitions for k = 156
c i = 1
c  -2+1 --> -1
c    ( b^{156, 1}_2 ∧  b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧  p_156) -> ( b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0)
c  in CNF:
c    -b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨  b^{156, 2}_2
c    -b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_1
c    -b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨  b^{156, 2}_0
c  in DIMACS:
-21005 -21006  21007 -156  21008 0
-21005 -21006  21007 -156 -21009 0
-21005 -21006  21007 -156  21010 0

c  -1+1 --> 0
c    ( b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧  b^{156, 1}_0 ∧  p_156) -> (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧ -b^{156, 2}_0)
c  in CNF:
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_2
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_1
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_0
c  in DIMACS:
-21005  21006 -21007 -156 -21008 0
-21005  21006 -21007 -156 -21009 0
-21005  21006 -21007 -156 -21010 0

c  0+1 --> 1
c    (-b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧  p_156) -> (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0)
c  in CNF:
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_2
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_1
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨  b^{156, 2}_0
c  in DIMACS:
 21005  21006  21007 -156 -21008 0
 21005  21006  21007 -156 -21009 0
 21005  21006  21007 -156  21010 0

c  1+1 --> 2
c    (-b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧  b^{156, 1}_0 ∧  p_156) -> (-b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0)
c  in CNF:
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_2
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨  b^{156, 2}_1
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ -p_156 ∨ -b^{156, 2}_0
c  in DIMACS:
 21005  21006 -21007 -156 -21008 0
 21005  21006 -21007 -156  21009 0
 21005  21006 -21007 -156 -21010 0

c  2+1 --> break 
c    (-b^{156, 1}_2 ∧  b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧  p_156) -> break
c  in CNF:
c     b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ -p_156 ∨ break
c  in DIMACS:
 21005 -21006  21007 -156 1162 0


c  2-1 --> 1
c    (-b^{156, 1}_2 ∧  b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧ -p_156) -> (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0)
c  in CNF:
c     b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_2
c     b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_1
c     b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨  b^{156, 2}_0
c  in DIMACS:
 21005 -21006  21007  156 -21008 0
 21005 -21006  21007  156 -21009 0
 21005 -21006  21007  156  21010 0

c  1-1 --> 0
c    (-b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧  b^{156, 1}_0 ∧ -p_156) -> (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧ -b^{156, 2}_0)
c  in CNF:
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_2
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_1
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_0
c  in DIMACS:
 21005  21006 -21007  156 -21008 0
 21005  21006 -21007  156 -21009 0
 21005  21006 -21007  156 -21010 0

c  0-1 --> -1
c    (-b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧ -p_156) -> ( b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0)
c  in CNF:
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨  b^{156, 2}_2
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_1
c     b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨  b^{156, 2}_0
c  in DIMACS:
 21005  21006  21007  156  21008 0
 21005  21006  21007  156 -21009 0
 21005  21006  21007  156  21010 0

c  -1-1 --> -2
c    ( b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧  b^{156, 1}_0 ∧ -p_156) -> ( b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0)
c  in CNF:
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨  b^{156, 2}_2
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨  b^{156, 2}_1
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨  p_156 ∨ -b^{156, 2}_0
c  in DIMACS:
-21005  21006 -21007  156  21008 0
-21005  21006 -21007  156  21009 0
-21005  21006 -21007  156 -21010 0

c  -2-1 --> break 
c    ( b^{156, 1}_2 ∧  b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧ -p_156) -> break
c  in CNF:
c    -b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨  b^{156, 1}_0 ∨  p_156 ∨ break
c  in DIMACS:
-21005 -21006  21007  156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 1}_2 ∧ -b^{156, 1}_1 ∧ -b^{156, 1}_0 ∧ true) 
c  in CNF:
c    -b^{156, 1}_2 ∨  b^{156, 1}_1 ∨  b^{156, 1}_0 ∨ false 
c  in DIMACS:
-21005  21006  21007  0

c  3 does not represent an automaton state.
c    -(-b^{156, 1}_2 ∧  b^{156, 1}_1 ∧  b^{156, 1}_0 ∧ true) 
c  in CNF:
c     b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ false 
c  in DIMACS:
 21005 -21006 -21007  0
c  -3 does not represent an automaton state.
c    -( b^{156, 1}_2 ∧  b^{156, 1}_1 ∧  b^{156, 1}_0 ∧ true) 
c  in CNF:
c    -b^{156, 1}_2 ∨ -b^{156, 1}_1 ∨ -b^{156, 1}_0 ∨ false 
c  in DIMACS:
-21005 -21006 -21007  0

c i = 2
c  -2+1 --> -1
c    ( b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧  p_312) -> ( b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0)
c  in CNF:
c    -b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨  b^{156, 3}_2
c    -b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_1
c    -b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨  b^{156, 3}_0
c  in DIMACS:
-21008 -21009  21010 -312  21011 0
-21008 -21009  21010 -312 -21012 0
-21008 -21009  21010 -312  21013 0

c  -1+1 --> 0
c    ( b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0 ∧  p_312) -> (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧ -b^{156, 3}_0)
c  in CNF:
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_2
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_1
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_0
c  in DIMACS:
-21008  21009 -21010 -312 -21011 0
-21008  21009 -21010 -312 -21012 0
-21008  21009 -21010 -312 -21013 0

c  0+1 --> 1
c    (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧  p_312) -> (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0)
c  in CNF:
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_2
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_1
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨  b^{156, 3}_0
c  in DIMACS:
 21008  21009  21010 -312 -21011 0
 21008  21009  21010 -312 -21012 0
 21008  21009  21010 -312  21013 0

c  1+1 --> 2
c    (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0 ∧  p_312) -> (-b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0)
c  in CNF:
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_2
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨  b^{156, 3}_1
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ -p_312 ∨ -b^{156, 3}_0
c  in DIMACS:
 21008  21009 -21010 -312 -21011 0
 21008  21009 -21010 -312  21012 0
 21008  21009 -21010 -312 -21013 0

c  2+1 --> break 
c    (-b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧  p_312) -> break
c  in CNF:
c     b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 21008 -21009  21010 -312 1162 0


c  2-1 --> 1
c    (-b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧ -p_312) -> (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0)
c  in CNF:
c     b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_2
c     b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_1
c     b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨  b^{156, 3}_0
c  in DIMACS:
 21008 -21009  21010  312 -21011 0
 21008 -21009  21010  312 -21012 0
 21008 -21009  21010  312  21013 0

c  1-1 --> 0
c    (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0 ∧ -p_312) -> (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧ -b^{156, 3}_0)
c  in CNF:
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_2
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_1
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_0
c  in DIMACS:
 21008  21009 -21010  312 -21011 0
 21008  21009 -21010  312 -21012 0
 21008  21009 -21010  312 -21013 0

c  0-1 --> -1
c    (-b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧ -p_312) -> ( b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0)
c  in CNF:
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨  b^{156, 3}_2
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_1
c     b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨  b^{156, 3}_0
c  in DIMACS:
 21008  21009  21010  312  21011 0
 21008  21009  21010  312 -21012 0
 21008  21009  21010  312  21013 0

c  -1-1 --> -2
c    ( b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧  b^{156, 2}_0 ∧ -p_312) -> ( b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0)
c  in CNF:
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨  b^{156, 3}_2
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨  b^{156, 3}_1
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨  p_312 ∨ -b^{156, 3}_0
c  in DIMACS:
-21008  21009 -21010  312  21011 0
-21008  21009 -21010  312  21012 0
-21008  21009 -21010  312 -21013 0

c  -2-1 --> break 
c    ( b^{156, 2}_2 ∧  b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨  b^{156, 2}_0 ∨  p_312 ∨ break
c  in DIMACS:
-21008 -21009  21010  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 2}_2 ∧ -b^{156, 2}_1 ∧ -b^{156, 2}_0 ∧ true) 
c  in CNF:
c    -b^{156, 2}_2 ∨  b^{156, 2}_1 ∨  b^{156, 2}_0 ∨ false 
c  in DIMACS:
-21008  21009  21010  0

c  3 does not represent an automaton state.
c    -(-b^{156, 2}_2 ∧  b^{156, 2}_1 ∧  b^{156, 2}_0 ∧ true) 
c  in CNF:
c     b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ false 
c  in DIMACS:
 21008 -21009 -21010  0
c  -3 does not represent an automaton state.
c    -( b^{156, 2}_2 ∧  b^{156, 2}_1 ∧  b^{156, 2}_0 ∧ true) 
c  in CNF:
c    -b^{156, 2}_2 ∨ -b^{156, 2}_1 ∨ -b^{156, 2}_0 ∨ false 
c  in DIMACS:
-21008 -21009 -21010  0

c i = 3
c  -2+1 --> -1
c    ( b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧  p_468) -> ( b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0)
c  in CNF:
c    -b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨  b^{156, 4}_2
c    -b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_1
c    -b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨  b^{156, 4}_0
c  in DIMACS:
-21011 -21012  21013 -468  21014 0
-21011 -21012  21013 -468 -21015 0
-21011 -21012  21013 -468  21016 0

c  -1+1 --> 0
c    ( b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0 ∧  p_468) -> (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧ -b^{156, 4}_0)
c  in CNF:
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_2
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_1
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_0
c  in DIMACS:
-21011  21012 -21013 -468 -21014 0
-21011  21012 -21013 -468 -21015 0
-21011  21012 -21013 -468 -21016 0

c  0+1 --> 1
c    (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧  p_468) -> (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0)
c  in CNF:
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_2
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_1
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨  b^{156, 4}_0
c  in DIMACS:
 21011  21012  21013 -468 -21014 0
 21011  21012  21013 -468 -21015 0
 21011  21012  21013 -468  21016 0

c  1+1 --> 2
c    (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0 ∧  p_468) -> (-b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0)
c  in CNF:
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_2
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨  b^{156, 4}_1
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ -p_468 ∨ -b^{156, 4}_0
c  in DIMACS:
 21011  21012 -21013 -468 -21014 0
 21011  21012 -21013 -468  21015 0
 21011  21012 -21013 -468 -21016 0

c  2+1 --> break 
c    (-b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧  p_468) -> break
c  in CNF:
c     b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 21011 -21012  21013 -468 1162 0


c  2-1 --> 1
c    (-b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧ -p_468) -> (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0)
c  in CNF:
c     b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_2
c     b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_1
c     b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨  b^{156, 4}_0
c  in DIMACS:
 21011 -21012  21013  468 -21014 0
 21011 -21012  21013  468 -21015 0
 21011 -21012  21013  468  21016 0

c  1-1 --> 0
c    (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0 ∧ -p_468) -> (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧ -b^{156, 4}_0)
c  in CNF:
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_2
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_1
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_0
c  in DIMACS:
 21011  21012 -21013  468 -21014 0
 21011  21012 -21013  468 -21015 0
 21011  21012 -21013  468 -21016 0

c  0-1 --> -1
c    (-b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧ -p_468) -> ( b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0)
c  in CNF:
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨  b^{156, 4}_2
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_1
c     b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨  b^{156, 4}_0
c  in DIMACS:
 21011  21012  21013  468  21014 0
 21011  21012  21013  468 -21015 0
 21011  21012  21013  468  21016 0

c  -1-1 --> -2
c    ( b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧  b^{156, 3}_0 ∧ -p_468) -> ( b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0)
c  in CNF:
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨  b^{156, 4}_2
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨  b^{156, 4}_1
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨  p_468 ∨ -b^{156, 4}_0
c  in DIMACS:
-21011  21012 -21013  468  21014 0
-21011  21012 -21013  468  21015 0
-21011  21012 -21013  468 -21016 0

c  -2-1 --> break 
c    ( b^{156, 3}_2 ∧  b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨  b^{156, 3}_0 ∨  p_468 ∨ break
c  in DIMACS:
-21011 -21012  21013  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 3}_2 ∧ -b^{156, 3}_1 ∧ -b^{156, 3}_0 ∧ true) 
c  in CNF:
c    -b^{156, 3}_2 ∨  b^{156, 3}_1 ∨  b^{156, 3}_0 ∨ false 
c  in DIMACS:
-21011  21012  21013  0

c  3 does not represent an automaton state.
c    -(-b^{156, 3}_2 ∧  b^{156, 3}_1 ∧  b^{156, 3}_0 ∧ true) 
c  in CNF:
c     b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ false 
c  in DIMACS:
 21011 -21012 -21013  0
c  -3 does not represent an automaton state.
c    -( b^{156, 3}_2 ∧  b^{156, 3}_1 ∧  b^{156, 3}_0 ∧ true) 
c  in CNF:
c    -b^{156, 3}_2 ∨ -b^{156, 3}_1 ∨ -b^{156, 3}_0 ∨ false 
c  in DIMACS:
-21011 -21012 -21013  0

c i = 4
c  -2+1 --> -1
c    ( b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧  p_624) -> ( b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0)
c  in CNF:
c    -b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨  b^{156, 5}_2
c    -b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_1
c    -b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨  b^{156, 5}_0
c  in DIMACS:
-21014 -21015  21016 -624  21017 0
-21014 -21015  21016 -624 -21018 0
-21014 -21015  21016 -624  21019 0

c  -1+1 --> 0
c    ( b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0 ∧  p_624) -> (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧ -b^{156, 5}_0)
c  in CNF:
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_2
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_1
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_0
c  in DIMACS:
-21014  21015 -21016 -624 -21017 0
-21014  21015 -21016 -624 -21018 0
-21014  21015 -21016 -624 -21019 0

c  0+1 --> 1
c    (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧  p_624) -> (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0)
c  in CNF:
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_2
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_1
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨  b^{156, 5}_0
c  in DIMACS:
 21014  21015  21016 -624 -21017 0
 21014  21015  21016 -624 -21018 0
 21014  21015  21016 -624  21019 0

c  1+1 --> 2
c    (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0 ∧  p_624) -> (-b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0)
c  in CNF:
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_2
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨  b^{156, 5}_1
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ -p_624 ∨ -b^{156, 5}_0
c  in DIMACS:
 21014  21015 -21016 -624 -21017 0
 21014  21015 -21016 -624  21018 0
 21014  21015 -21016 -624 -21019 0

c  2+1 --> break 
c    (-b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧  p_624) -> break
c  in CNF:
c     b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 21014 -21015  21016 -624 1162 0


c  2-1 --> 1
c    (-b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧ -p_624) -> (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0)
c  in CNF:
c     b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_2
c     b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_1
c     b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨  b^{156, 5}_0
c  in DIMACS:
 21014 -21015  21016  624 -21017 0
 21014 -21015  21016  624 -21018 0
 21014 -21015  21016  624  21019 0

c  1-1 --> 0
c    (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0 ∧ -p_624) -> (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧ -b^{156, 5}_0)
c  in CNF:
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_2
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_1
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_0
c  in DIMACS:
 21014  21015 -21016  624 -21017 0
 21014  21015 -21016  624 -21018 0
 21014  21015 -21016  624 -21019 0

c  0-1 --> -1
c    (-b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧ -p_624) -> ( b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0)
c  in CNF:
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨  b^{156, 5}_2
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_1
c     b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨  b^{156, 5}_0
c  in DIMACS:
 21014  21015  21016  624  21017 0
 21014  21015  21016  624 -21018 0
 21014  21015  21016  624  21019 0

c  -1-1 --> -2
c    ( b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧  b^{156, 4}_0 ∧ -p_624) -> ( b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0)
c  in CNF:
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨  b^{156, 5}_2
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨  b^{156, 5}_1
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨  p_624 ∨ -b^{156, 5}_0
c  in DIMACS:
-21014  21015 -21016  624  21017 0
-21014  21015 -21016  624  21018 0
-21014  21015 -21016  624 -21019 0

c  -2-1 --> break 
c    ( b^{156, 4}_2 ∧  b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨  b^{156, 4}_0 ∨  p_624 ∨ break
c  in DIMACS:
-21014 -21015  21016  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 4}_2 ∧ -b^{156, 4}_1 ∧ -b^{156, 4}_0 ∧ true) 
c  in CNF:
c    -b^{156, 4}_2 ∨  b^{156, 4}_1 ∨  b^{156, 4}_0 ∨ false 
c  in DIMACS:
-21014  21015  21016  0

c  3 does not represent an automaton state.
c    -(-b^{156, 4}_2 ∧  b^{156, 4}_1 ∧  b^{156, 4}_0 ∧ true) 
c  in CNF:
c     b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ false 
c  in DIMACS:
 21014 -21015 -21016  0
c  -3 does not represent an automaton state.
c    -( b^{156, 4}_2 ∧  b^{156, 4}_1 ∧  b^{156, 4}_0 ∧ true) 
c  in CNF:
c    -b^{156, 4}_2 ∨ -b^{156, 4}_1 ∨ -b^{156, 4}_0 ∨ false 
c  in DIMACS:
-21014 -21015 -21016  0

c i = 5
c  -2+1 --> -1
c    ( b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧  p_780) -> ( b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0)
c  in CNF:
c    -b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨  b^{156, 6}_2
c    -b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_1
c    -b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨  b^{156, 6}_0
c  in DIMACS:
-21017 -21018  21019 -780  21020 0
-21017 -21018  21019 -780 -21021 0
-21017 -21018  21019 -780  21022 0

c  -1+1 --> 0
c    ( b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0 ∧  p_780) -> (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧ -b^{156, 6}_0)
c  in CNF:
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_2
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_1
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_0
c  in DIMACS:
-21017  21018 -21019 -780 -21020 0
-21017  21018 -21019 -780 -21021 0
-21017  21018 -21019 -780 -21022 0

c  0+1 --> 1
c    (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧  p_780) -> (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0)
c  in CNF:
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_2
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_1
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨  b^{156, 6}_0
c  in DIMACS:
 21017  21018  21019 -780 -21020 0
 21017  21018  21019 -780 -21021 0
 21017  21018  21019 -780  21022 0

c  1+1 --> 2
c    (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0 ∧  p_780) -> (-b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0)
c  in CNF:
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_2
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨  b^{156, 6}_1
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ -p_780 ∨ -b^{156, 6}_0
c  in DIMACS:
 21017  21018 -21019 -780 -21020 0
 21017  21018 -21019 -780  21021 0
 21017  21018 -21019 -780 -21022 0

c  2+1 --> break 
c    (-b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧  p_780) -> break
c  in CNF:
c     b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 21017 -21018  21019 -780 1162 0


c  2-1 --> 1
c    (-b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧ -p_780) -> (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0)
c  in CNF:
c     b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_2
c     b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_1
c     b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨  b^{156, 6}_0
c  in DIMACS:
 21017 -21018  21019  780 -21020 0
 21017 -21018  21019  780 -21021 0
 21017 -21018  21019  780  21022 0

c  1-1 --> 0
c    (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0 ∧ -p_780) -> (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧ -b^{156, 6}_0)
c  in CNF:
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_2
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_1
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_0
c  in DIMACS:
 21017  21018 -21019  780 -21020 0
 21017  21018 -21019  780 -21021 0
 21017  21018 -21019  780 -21022 0

c  0-1 --> -1
c    (-b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧ -p_780) -> ( b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0)
c  in CNF:
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨  b^{156, 6}_2
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_1
c     b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨  b^{156, 6}_0
c  in DIMACS:
 21017  21018  21019  780  21020 0
 21017  21018  21019  780 -21021 0
 21017  21018  21019  780  21022 0

c  -1-1 --> -2
c    ( b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧  b^{156, 5}_0 ∧ -p_780) -> ( b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0)
c  in CNF:
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨  b^{156, 6}_2
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨  b^{156, 6}_1
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨  p_780 ∨ -b^{156, 6}_0
c  in DIMACS:
-21017  21018 -21019  780  21020 0
-21017  21018 -21019  780  21021 0
-21017  21018 -21019  780 -21022 0

c  -2-1 --> break 
c    ( b^{156, 5}_2 ∧  b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨  b^{156, 5}_0 ∨  p_780 ∨ break
c  in DIMACS:
-21017 -21018  21019  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 5}_2 ∧ -b^{156, 5}_1 ∧ -b^{156, 5}_0 ∧ true) 
c  in CNF:
c    -b^{156, 5}_2 ∨  b^{156, 5}_1 ∨  b^{156, 5}_0 ∨ false 
c  in DIMACS:
-21017  21018  21019  0

c  3 does not represent an automaton state.
c    -(-b^{156, 5}_2 ∧  b^{156, 5}_1 ∧  b^{156, 5}_0 ∧ true) 
c  in CNF:
c     b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ false 
c  in DIMACS:
 21017 -21018 -21019  0
c  -3 does not represent an automaton state.
c    -( b^{156, 5}_2 ∧  b^{156, 5}_1 ∧  b^{156, 5}_0 ∧ true) 
c  in CNF:
c    -b^{156, 5}_2 ∨ -b^{156, 5}_1 ∨ -b^{156, 5}_0 ∨ false 
c  in DIMACS:
-21017 -21018 -21019  0

c i = 6
c  -2+1 --> -1
c    ( b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧  p_936) -> ( b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0)
c  in CNF:
c    -b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨  b^{156, 7}_2
c    -b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_1
c    -b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨  b^{156, 7}_0
c  in DIMACS:
-21020 -21021  21022 -936  21023 0
-21020 -21021  21022 -936 -21024 0
-21020 -21021  21022 -936  21025 0

c  -1+1 --> 0
c    ( b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0 ∧  p_936) -> (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧ -b^{156, 7}_0)
c  in CNF:
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_2
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_1
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_0
c  in DIMACS:
-21020  21021 -21022 -936 -21023 0
-21020  21021 -21022 -936 -21024 0
-21020  21021 -21022 -936 -21025 0

c  0+1 --> 1
c    (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧  p_936) -> (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0)
c  in CNF:
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_2
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_1
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨  b^{156, 7}_0
c  in DIMACS:
 21020  21021  21022 -936 -21023 0
 21020  21021  21022 -936 -21024 0
 21020  21021  21022 -936  21025 0

c  1+1 --> 2
c    (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0 ∧  p_936) -> (-b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0)
c  in CNF:
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_2
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨  b^{156, 7}_1
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ -p_936 ∨ -b^{156, 7}_0
c  in DIMACS:
 21020  21021 -21022 -936 -21023 0
 21020  21021 -21022 -936  21024 0
 21020  21021 -21022 -936 -21025 0

c  2+1 --> break 
c    (-b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧  p_936) -> break
c  in CNF:
c     b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 21020 -21021  21022 -936 1162 0


c  2-1 --> 1
c    (-b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧ -p_936) -> (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0)
c  in CNF:
c     b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_2
c     b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_1
c     b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨  b^{156, 7}_0
c  in DIMACS:
 21020 -21021  21022  936 -21023 0
 21020 -21021  21022  936 -21024 0
 21020 -21021  21022  936  21025 0

c  1-1 --> 0
c    (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0 ∧ -p_936) -> (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧ -b^{156, 7}_0)
c  in CNF:
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_2
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_1
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_0
c  in DIMACS:
 21020  21021 -21022  936 -21023 0
 21020  21021 -21022  936 -21024 0
 21020  21021 -21022  936 -21025 0

c  0-1 --> -1
c    (-b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧ -p_936) -> ( b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0)
c  in CNF:
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨  b^{156, 7}_2
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_1
c     b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨  b^{156, 7}_0
c  in DIMACS:
 21020  21021  21022  936  21023 0
 21020  21021  21022  936 -21024 0
 21020  21021  21022  936  21025 0

c  -1-1 --> -2
c    ( b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧  b^{156, 6}_0 ∧ -p_936) -> ( b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0)
c  in CNF:
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨  b^{156, 7}_2
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨  b^{156, 7}_1
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨  p_936 ∨ -b^{156, 7}_0
c  in DIMACS:
-21020  21021 -21022  936  21023 0
-21020  21021 -21022  936  21024 0
-21020  21021 -21022  936 -21025 0

c  -2-1 --> break 
c    ( b^{156, 6}_2 ∧  b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨  b^{156, 6}_0 ∨  p_936 ∨ break
c  in DIMACS:
-21020 -21021  21022  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 6}_2 ∧ -b^{156, 6}_1 ∧ -b^{156, 6}_0 ∧ true) 
c  in CNF:
c    -b^{156, 6}_2 ∨  b^{156, 6}_1 ∨  b^{156, 6}_0 ∨ false 
c  in DIMACS:
-21020  21021  21022  0

c  3 does not represent an automaton state.
c    -(-b^{156, 6}_2 ∧  b^{156, 6}_1 ∧  b^{156, 6}_0 ∧ true) 
c  in CNF:
c     b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ false 
c  in DIMACS:
 21020 -21021 -21022  0
c  -3 does not represent an automaton state.
c    -( b^{156, 6}_2 ∧  b^{156, 6}_1 ∧  b^{156, 6}_0 ∧ true) 
c  in CNF:
c    -b^{156, 6}_2 ∨ -b^{156, 6}_1 ∨ -b^{156, 6}_0 ∨ false 
c  in DIMACS:
-21020 -21021 -21022  0

c i = 7
c  -2+1 --> -1
c    ( b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧  p_1092) -> ( b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧  b^{156, 8}_0)
c  in CNF:
c    -b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨  b^{156, 8}_2
c    -b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_1
c    -b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨  b^{156, 8}_0
c  in DIMACS:
-21023 -21024  21025 -1092  21026 0
-21023 -21024  21025 -1092 -21027 0
-21023 -21024  21025 -1092  21028 0

c  -1+1 --> 0
c    ( b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0 ∧  p_1092) -> (-b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧ -b^{156, 8}_0)
c  in CNF:
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_2
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_1
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_0
c  in DIMACS:
-21023  21024 -21025 -1092 -21026 0
-21023  21024 -21025 -1092 -21027 0
-21023  21024 -21025 -1092 -21028 0

c  0+1 --> 1
c    (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧  p_1092) -> (-b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧  b^{156, 8}_0)
c  in CNF:
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_2
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_1
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨  b^{156, 8}_0
c  in DIMACS:
 21023  21024  21025 -1092 -21026 0
 21023  21024  21025 -1092 -21027 0
 21023  21024  21025 -1092  21028 0

c  1+1 --> 2
c    (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0 ∧  p_1092) -> (-b^{156, 8}_2 ∧  b^{156, 8}_1 ∧ -b^{156, 8}_0)
c  in CNF:
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_2
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨  b^{156, 8}_1
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ -p_1092 ∨ -b^{156, 8}_0
c  in DIMACS:
 21023  21024 -21025 -1092 -21026 0
 21023  21024 -21025 -1092  21027 0
 21023  21024 -21025 -1092 -21028 0

c  2+1 --> break 
c    (-b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 21023 -21024  21025 -1092 1162 0


c  2-1 --> 1
c    (-b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧ -p_1092) -> (-b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧  b^{156, 8}_0)
c  in CNF:
c     b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_2
c     b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_1
c     b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨  b^{156, 8}_0
c  in DIMACS:
 21023 -21024  21025  1092 -21026 0
 21023 -21024  21025  1092 -21027 0
 21023 -21024  21025  1092  21028 0

c  1-1 --> 0
c    (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0 ∧ -p_1092) -> (-b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧ -b^{156, 8}_0)
c  in CNF:
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_2
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_1
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_0
c  in DIMACS:
 21023  21024 -21025  1092 -21026 0
 21023  21024 -21025  1092 -21027 0
 21023  21024 -21025  1092 -21028 0

c  0-1 --> -1
c    (-b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧ -p_1092) -> ( b^{156, 8}_2 ∧ -b^{156, 8}_1 ∧  b^{156, 8}_0)
c  in CNF:
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨  b^{156, 8}_2
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_1
c     b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨  b^{156, 8}_0
c  in DIMACS:
 21023  21024  21025  1092  21026 0
 21023  21024  21025  1092 -21027 0
 21023  21024  21025  1092  21028 0

c  -1-1 --> -2
c    ( b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧  b^{156, 7}_0 ∧ -p_1092) -> ( b^{156, 8}_2 ∧  b^{156, 8}_1 ∧ -b^{156, 8}_0)
c  in CNF:
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨  b^{156, 8}_2
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨  b^{156, 8}_1
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨  p_1092 ∨ -b^{156, 8}_0
c  in DIMACS:
-21023  21024 -21025  1092  21026 0
-21023  21024 -21025  1092  21027 0
-21023  21024 -21025  1092 -21028 0

c  -2-1 --> break 
c    ( b^{156, 7}_2 ∧  b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨  b^{156, 7}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-21023 -21024  21025  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{156, 7}_2 ∧ -b^{156, 7}_1 ∧ -b^{156, 7}_0 ∧ true) 
c  in CNF:
c    -b^{156, 7}_2 ∨  b^{156, 7}_1 ∨  b^{156, 7}_0 ∨ false 
c  in DIMACS:
-21023  21024  21025  0

c  3 does not represent an automaton state.
c    -(-b^{156, 7}_2 ∧  b^{156, 7}_1 ∧  b^{156, 7}_0 ∧ true) 
c  in CNF:
c     b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ false 
c  in DIMACS:
 21023 -21024 -21025  0
c  -3 does not represent an automaton state.
c    -( b^{156, 7}_2 ∧  b^{156, 7}_1 ∧  b^{156, 7}_0 ∧ true) 
c  in CNF:
c    -b^{156, 7}_2 ∨ -b^{156, 7}_1 ∨ -b^{156, 7}_0 ∨ false 
c  in DIMACS:
-21023 -21024 -21025  0

c INIT for k = 157
c    -b^{157, 1}_2
c    -b^{157, 1}_1
c    -b^{157, 1}_0
c  in DIMACS:
-21029 0
-21030 0
-21031 0

c Transitions for k = 157
c i = 1
c  -2+1 --> -1
c    ( b^{157, 1}_2 ∧  b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧  p_157) -> ( b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0)
c  in CNF:
c    -b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨  b^{157, 2}_2
c    -b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_1
c    -b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨  b^{157, 2}_0
c  in DIMACS:
-21029 -21030  21031 -157  21032 0
-21029 -21030  21031 -157 -21033 0
-21029 -21030  21031 -157  21034 0

c  -1+1 --> 0
c    ( b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧  b^{157, 1}_0 ∧  p_157) -> (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧ -b^{157, 2}_0)
c  in CNF:
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_2
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_1
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_0
c  in DIMACS:
-21029  21030 -21031 -157 -21032 0
-21029  21030 -21031 -157 -21033 0
-21029  21030 -21031 -157 -21034 0

c  0+1 --> 1
c    (-b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧  p_157) -> (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0)
c  in CNF:
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_2
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_1
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨  b^{157, 2}_0
c  in DIMACS:
 21029  21030  21031 -157 -21032 0
 21029  21030  21031 -157 -21033 0
 21029  21030  21031 -157  21034 0

c  1+1 --> 2
c    (-b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧  b^{157, 1}_0 ∧  p_157) -> (-b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0)
c  in CNF:
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_2
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨  b^{157, 2}_1
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ -p_157 ∨ -b^{157, 2}_0
c  in DIMACS:
 21029  21030 -21031 -157 -21032 0
 21029  21030 -21031 -157  21033 0
 21029  21030 -21031 -157 -21034 0

c  2+1 --> break 
c    (-b^{157, 1}_2 ∧  b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧  p_157) -> break
c  in CNF:
c     b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ -p_157 ∨ break
c  in DIMACS:
 21029 -21030  21031 -157 1162 0


c  2-1 --> 1
c    (-b^{157, 1}_2 ∧  b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧ -p_157) -> (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0)
c  in CNF:
c     b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_2
c     b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_1
c     b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨  b^{157, 2}_0
c  in DIMACS:
 21029 -21030  21031  157 -21032 0
 21029 -21030  21031  157 -21033 0
 21029 -21030  21031  157  21034 0

c  1-1 --> 0
c    (-b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧  b^{157, 1}_0 ∧ -p_157) -> (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧ -b^{157, 2}_0)
c  in CNF:
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_2
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_1
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_0
c  in DIMACS:
 21029  21030 -21031  157 -21032 0
 21029  21030 -21031  157 -21033 0
 21029  21030 -21031  157 -21034 0

c  0-1 --> -1
c    (-b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧ -p_157) -> ( b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0)
c  in CNF:
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨  b^{157, 2}_2
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_1
c     b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨  b^{157, 2}_0
c  in DIMACS:
 21029  21030  21031  157  21032 0
 21029  21030  21031  157 -21033 0
 21029  21030  21031  157  21034 0

c  -1-1 --> -2
c    ( b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧  b^{157, 1}_0 ∧ -p_157) -> ( b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0)
c  in CNF:
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨  b^{157, 2}_2
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨  b^{157, 2}_1
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨  p_157 ∨ -b^{157, 2}_0
c  in DIMACS:
-21029  21030 -21031  157  21032 0
-21029  21030 -21031  157  21033 0
-21029  21030 -21031  157 -21034 0

c  -2-1 --> break 
c    ( b^{157, 1}_2 ∧  b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧ -p_157) -> break
c  in CNF:
c    -b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨  b^{157, 1}_0 ∨  p_157 ∨ break
c  in DIMACS:
-21029 -21030  21031  157 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 1}_2 ∧ -b^{157, 1}_1 ∧ -b^{157, 1}_0 ∧ true) 
c  in CNF:
c    -b^{157, 1}_2 ∨  b^{157, 1}_1 ∨  b^{157, 1}_0 ∨ false 
c  in DIMACS:
-21029  21030  21031  0

c  3 does not represent an automaton state.
c    -(-b^{157, 1}_2 ∧  b^{157, 1}_1 ∧  b^{157, 1}_0 ∧ true) 
c  in CNF:
c     b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ false 
c  in DIMACS:
 21029 -21030 -21031  0
c  -3 does not represent an automaton state.
c    -( b^{157, 1}_2 ∧  b^{157, 1}_1 ∧  b^{157, 1}_0 ∧ true) 
c  in CNF:
c    -b^{157, 1}_2 ∨ -b^{157, 1}_1 ∨ -b^{157, 1}_0 ∨ false 
c  in DIMACS:
-21029 -21030 -21031  0

c i = 2
c  -2+1 --> -1
c    ( b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧  p_314) -> ( b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0)
c  in CNF:
c    -b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨  b^{157, 3}_2
c    -b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_1
c    -b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨  b^{157, 3}_0
c  in DIMACS:
-21032 -21033  21034 -314  21035 0
-21032 -21033  21034 -314 -21036 0
-21032 -21033  21034 -314  21037 0

c  -1+1 --> 0
c    ( b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0 ∧  p_314) -> (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧ -b^{157, 3}_0)
c  in CNF:
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_2
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_1
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_0
c  in DIMACS:
-21032  21033 -21034 -314 -21035 0
-21032  21033 -21034 -314 -21036 0
-21032  21033 -21034 -314 -21037 0

c  0+1 --> 1
c    (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧  p_314) -> (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0)
c  in CNF:
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_2
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_1
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨  b^{157, 3}_0
c  in DIMACS:
 21032  21033  21034 -314 -21035 0
 21032  21033  21034 -314 -21036 0
 21032  21033  21034 -314  21037 0

c  1+1 --> 2
c    (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0 ∧  p_314) -> (-b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0)
c  in CNF:
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_2
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨  b^{157, 3}_1
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ -p_314 ∨ -b^{157, 3}_0
c  in DIMACS:
 21032  21033 -21034 -314 -21035 0
 21032  21033 -21034 -314  21036 0
 21032  21033 -21034 -314 -21037 0

c  2+1 --> break 
c    (-b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧  p_314) -> break
c  in CNF:
c     b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ -p_314 ∨ break
c  in DIMACS:
 21032 -21033  21034 -314 1162 0


c  2-1 --> 1
c    (-b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧ -p_314) -> (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0)
c  in CNF:
c     b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_2
c     b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_1
c     b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨  b^{157, 3}_0
c  in DIMACS:
 21032 -21033  21034  314 -21035 0
 21032 -21033  21034  314 -21036 0
 21032 -21033  21034  314  21037 0

c  1-1 --> 0
c    (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0 ∧ -p_314) -> (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧ -b^{157, 3}_0)
c  in CNF:
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_2
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_1
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_0
c  in DIMACS:
 21032  21033 -21034  314 -21035 0
 21032  21033 -21034  314 -21036 0
 21032  21033 -21034  314 -21037 0

c  0-1 --> -1
c    (-b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧ -p_314) -> ( b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0)
c  in CNF:
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨  b^{157, 3}_2
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_1
c     b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨  b^{157, 3}_0
c  in DIMACS:
 21032  21033  21034  314  21035 0
 21032  21033  21034  314 -21036 0
 21032  21033  21034  314  21037 0

c  -1-1 --> -2
c    ( b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧  b^{157, 2}_0 ∧ -p_314) -> ( b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0)
c  in CNF:
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨  b^{157, 3}_2
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨  b^{157, 3}_1
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨  p_314 ∨ -b^{157, 3}_0
c  in DIMACS:
-21032  21033 -21034  314  21035 0
-21032  21033 -21034  314  21036 0
-21032  21033 -21034  314 -21037 0

c  -2-1 --> break 
c    ( b^{157, 2}_2 ∧  b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧ -p_314) -> break
c  in CNF:
c    -b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨  b^{157, 2}_0 ∨  p_314 ∨ break
c  in DIMACS:
-21032 -21033  21034  314 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 2}_2 ∧ -b^{157, 2}_1 ∧ -b^{157, 2}_0 ∧ true) 
c  in CNF:
c    -b^{157, 2}_2 ∨  b^{157, 2}_1 ∨  b^{157, 2}_0 ∨ false 
c  in DIMACS:
-21032  21033  21034  0

c  3 does not represent an automaton state.
c    -(-b^{157, 2}_2 ∧  b^{157, 2}_1 ∧  b^{157, 2}_0 ∧ true) 
c  in CNF:
c     b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ false 
c  in DIMACS:
 21032 -21033 -21034  0
c  -3 does not represent an automaton state.
c    -( b^{157, 2}_2 ∧  b^{157, 2}_1 ∧  b^{157, 2}_0 ∧ true) 
c  in CNF:
c    -b^{157, 2}_2 ∨ -b^{157, 2}_1 ∨ -b^{157, 2}_0 ∨ false 
c  in DIMACS:
-21032 -21033 -21034  0

c i = 3
c  -2+1 --> -1
c    ( b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧  p_471) -> ( b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0)
c  in CNF:
c    -b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨  b^{157, 4}_2
c    -b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_1
c    -b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨  b^{157, 4}_0
c  in DIMACS:
-21035 -21036  21037 -471  21038 0
-21035 -21036  21037 -471 -21039 0
-21035 -21036  21037 -471  21040 0

c  -1+1 --> 0
c    ( b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0 ∧  p_471) -> (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧ -b^{157, 4}_0)
c  in CNF:
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_2
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_1
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_0
c  in DIMACS:
-21035  21036 -21037 -471 -21038 0
-21035  21036 -21037 -471 -21039 0
-21035  21036 -21037 -471 -21040 0

c  0+1 --> 1
c    (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧  p_471) -> (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0)
c  in CNF:
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_2
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_1
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨  b^{157, 4}_0
c  in DIMACS:
 21035  21036  21037 -471 -21038 0
 21035  21036  21037 -471 -21039 0
 21035  21036  21037 -471  21040 0

c  1+1 --> 2
c    (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0 ∧  p_471) -> (-b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0)
c  in CNF:
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_2
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨  b^{157, 4}_1
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ -p_471 ∨ -b^{157, 4}_0
c  in DIMACS:
 21035  21036 -21037 -471 -21038 0
 21035  21036 -21037 -471  21039 0
 21035  21036 -21037 -471 -21040 0

c  2+1 --> break 
c    (-b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧  p_471) -> break
c  in CNF:
c     b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ -p_471 ∨ break
c  in DIMACS:
 21035 -21036  21037 -471 1162 0


c  2-1 --> 1
c    (-b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧ -p_471) -> (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0)
c  in CNF:
c     b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_2
c     b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_1
c     b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨  b^{157, 4}_0
c  in DIMACS:
 21035 -21036  21037  471 -21038 0
 21035 -21036  21037  471 -21039 0
 21035 -21036  21037  471  21040 0

c  1-1 --> 0
c    (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0 ∧ -p_471) -> (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧ -b^{157, 4}_0)
c  in CNF:
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_2
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_1
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_0
c  in DIMACS:
 21035  21036 -21037  471 -21038 0
 21035  21036 -21037  471 -21039 0
 21035  21036 -21037  471 -21040 0

c  0-1 --> -1
c    (-b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧ -p_471) -> ( b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0)
c  in CNF:
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨  b^{157, 4}_2
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_1
c     b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨  b^{157, 4}_0
c  in DIMACS:
 21035  21036  21037  471  21038 0
 21035  21036  21037  471 -21039 0
 21035  21036  21037  471  21040 0

c  -1-1 --> -2
c    ( b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧  b^{157, 3}_0 ∧ -p_471) -> ( b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0)
c  in CNF:
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨  b^{157, 4}_2
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨  b^{157, 4}_1
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨  p_471 ∨ -b^{157, 4}_0
c  in DIMACS:
-21035  21036 -21037  471  21038 0
-21035  21036 -21037  471  21039 0
-21035  21036 -21037  471 -21040 0

c  -2-1 --> break 
c    ( b^{157, 3}_2 ∧  b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧ -p_471) -> break
c  in CNF:
c    -b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨  b^{157, 3}_0 ∨  p_471 ∨ break
c  in DIMACS:
-21035 -21036  21037  471 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 3}_2 ∧ -b^{157, 3}_1 ∧ -b^{157, 3}_0 ∧ true) 
c  in CNF:
c    -b^{157, 3}_2 ∨  b^{157, 3}_1 ∨  b^{157, 3}_0 ∨ false 
c  in DIMACS:
-21035  21036  21037  0

c  3 does not represent an automaton state.
c    -(-b^{157, 3}_2 ∧  b^{157, 3}_1 ∧  b^{157, 3}_0 ∧ true) 
c  in CNF:
c     b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ false 
c  in DIMACS:
 21035 -21036 -21037  0
c  -3 does not represent an automaton state.
c    -( b^{157, 3}_2 ∧  b^{157, 3}_1 ∧  b^{157, 3}_0 ∧ true) 
c  in CNF:
c    -b^{157, 3}_2 ∨ -b^{157, 3}_1 ∨ -b^{157, 3}_0 ∨ false 
c  in DIMACS:
-21035 -21036 -21037  0

c i = 4
c  -2+1 --> -1
c    ( b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧  p_628) -> ( b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0)
c  in CNF:
c    -b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨  b^{157, 5}_2
c    -b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_1
c    -b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨  b^{157, 5}_0
c  in DIMACS:
-21038 -21039  21040 -628  21041 0
-21038 -21039  21040 -628 -21042 0
-21038 -21039  21040 -628  21043 0

c  -1+1 --> 0
c    ( b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0 ∧  p_628) -> (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧ -b^{157, 5}_0)
c  in CNF:
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_2
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_1
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_0
c  in DIMACS:
-21038  21039 -21040 -628 -21041 0
-21038  21039 -21040 -628 -21042 0
-21038  21039 -21040 -628 -21043 0

c  0+1 --> 1
c    (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧  p_628) -> (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0)
c  in CNF:
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_2
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_1
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨  b^{157, 5}_0
c  in DIMACS:
 21038  21039  21040 -628 -21041 0
 21038  21039  21040 -628 -21042 0
 21038  21039  21040 -628  21043 0

c  1+1 --> 2
c    (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0 ∧  p_628) -> (-b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0)
c  in CNF:
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_2
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨  b^{157, 5}_1
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ -p_628 ∨ -b^{157, 5}_0
c  in DIMACS:
 21038  21039 -21040 -628 -21041 0
 21038  21039 -21040 -628  21042 0
 21038  21039 -21040 -628 -21043 0

c  2+1 --> break 
c    (-b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧  p_628) -> break
c  in CNF:
c     b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ -p_628 ∨ break
c  in DIMACS:
 21038 -21039  21040 -628 1162 0


c  2-1 --> 1
c    (-b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧ -p_628) -> (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0)
c  in CNF:
c     b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_2
c     b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_1
c     b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨  b^{157, 5}_0
c  in DIMACS:
 21038 -21039  21040  628 -21041 0
 21038 -21039  21040  628 -21042 0
 21038 -21039  21040  628  21043 0

c  1-1 --> 0
c    (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0 ∧ -p_628) -> (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧ -b^{157, 5}_0)
c  in CNF:
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_2
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_1
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_0
c  in DIMACS:
 21038  21039 -21040  628 -21041 0
 21038  21039 -21040  628 -21042 0
 21038  21039 -21040  628 -21043 0

c  0-1 --> -1
c    (-b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧ -p_628) -> ( b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0)
c  in CNF:
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨  b^{157, 5}_2
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_1
c     b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨  b^{157, 5}_0
c  in DIMACS:
 21038  21039  21040  628  21041 0
 21038  21039  21040  628 -21042 0
 21038  21039  21040  628  21043 0

c  -1-1 --> -2
c    ( b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧  b^{157, 4}_0 ∧ -p_628) -> ( b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0)
c  in CNF:
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨  b^{157, 5}_2
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨  b^{157, 5}_1
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨  p_628 ∨ -b^{157, 5}_0
c  in DIMACS:
-21038  21039 -21040  628  21041 0
-21038  21039 -21040  628  21042 0
-21038  21039 -21040  628 -21043 0

c  -2-1 --> break 
c    ( b^{157, 4}_2 ∧  b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧ -p_628) -> break
c  in CNF:
c    -b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨  b^{157, 4}_0 ∨  p_628 ∨ break
c  in DIMACS:
-21038 -21039  21040  628 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 4}_2 ∧ -b^{157, 4}_1 ∧ -b^{157, 4}_0 ∧ true) 
c  in CNF:
c    -b^{157, 4}_2 ∨  b^{157, 4}_1 ∨  b^{157, 4}_0 ∨ false 
c  in DIMACS:
-21038  21039  21040  0

c  3 does not represent an automaton state.
c    -(-b^{157, 4}_2 ∧  b^{157, 4}_1 ∧  b^{157, 4}_0 ∧ true) 
c  in CNF:
c     b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ false 
c  in DIMACS:
 21038 -21039 -21040  0
c  -3 does not represent an automaton state.
c    -( b^{157, 4}_2 ∧  b^{157, 4}_1 ∧  b^{157, 4}_0 ∧ true) 
c  in CNF:
c    -b^{157, 4}_2 ∨ -b^{157, 4}_1 ∨ -b^{157, 4}_0 ∨ false 
c  in DIMACS:
-21038 -21039 -21040  0

c i = 5
c  -2+1 --> -1
c    ( b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧  p_785) -> ( b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0)
c  in CNF:
c    -b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨  b^{157, 6}_2
c    -b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_1
c    -b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨  b^{157, 6}_0
c  in DIMACS:
-21041 -21042  21043 -785  21044 0
-21041 -21042  21043 -785 -21045 0
-21041 -21042  21043 -785  21046 0

c  -1+1 --> 0
c    ( b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0 ∧  p_785) -> (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧ -b^{157, 6}_0)
c  in CNF:
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_2
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_1
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_0
c  in DIMACS:
-21041  21042 -21043 -785 -21044 0
-21041  21042 -21043 -785 -21045 0
-21041  21042 -21043 -785 -21046 0

c  0+1 --> 1
c    (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧  p_785) -> (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0)
c  in CNF:
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_2
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_1
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨  b^{157, 6}_0
c  in DIMACS:
 21041  21042  21043 -785 -21044 0
 21041  21042  21043 -785 -21045 0
 21041  21042  21043 -785  21046 0

c  1+1 --> 2
c    (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0 ∧  p_785) -> (-b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0)
c  in CNF:
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_2
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨  b^{157, 6}_1
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ -p_785 ∨ -b^{157, 6}_0
c  in DIMACS:
 21041  21042 -21043 -785 -21044 0
 21041  21042 -21043 -785  21045 0
 21041  21042 -21043 -785 -21046 0

c  2+1 --> break 
c    (-b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧  p_785) -> break
c  in CNF:
c     b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ -p_785 ∨ break
c  in DIMACS:
 21041 -21042  21043 -785 1162 0


c  2-1 --> 1
c    (-b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧ -p_785) -> (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0)
c  in CNF:
c     b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_2
c     b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_1
c     b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨  b^{157, 6}_0
c  in DIMACS:
 21041 -21042  21043  785 -21044 0
 21041 -21042  21043  785 -21045 0
 21041 -21042  21043  785  21046 0

c  1-1 --> 0
c    (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0 ∧ -p_785) -> (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧ -b^{157, 6}_0)
c  in CNF:
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_2
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_1
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_0
c  in DIMACS:
 21041  21042 -21043  785 -21044 0
 21041  21042 -21043  785 -21045 0
 21041  21042 -21043  785 -21046 0

c  0-1 --> -1
c    (-b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧ -p_785) -> ( b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0)
c  in CNF:
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨  b^{157, 6}_2
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_1
c     b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨  b^{157, 6}_0
c  in DIMACS:
 21041  21042  21043  785  21044 0
 21041  21042  21043  785 -21045 0
 21041  21042  21043  785  21046 0

c  -1-1 --> -2
c    ( b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧  b^{157, 5}_0 ∧ -p_785) -> ( b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0)
c  in CNF:
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨  b^{157, 6}_2
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨  b^{157, 6}_1
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨  p_785 ∨ -b^{157, 6}_0
c  in DIMACS:
-21041  21042 -21043  785  21044 0
-21041  21042 -21043  785  21045 0
-21041  21042 -21043  785 -21046 0

c  -2-1 --> break 
c    ( b^{157, 5}_2 ∧  b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧ -p_785) -> break
c  in CNF:
c    -b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨  b^{157, 5}_0 ∨  p_785 ∨ break
c  in DIMACS:
-21041 -21042  21043  785 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 5}_2 ∧ -b^{157, 5}_1 ∧ -b^{157, 5}_0 ∧ true) 
c  in CNF:
c    -b^{157, 5}_2 ∨  b^{157, 5}_1 ∨  b^{157, 5}_0 ∨ false 
c  in DIMACS:
-21041  21042  21043  0

c  3 does not represent an automaton state.
c    -(-b^{157, 5}_2 ∧  b^{157, 5}_1 ∧  b^{157, 5}_0 ∧ true) 
c  in CNF:
c     b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ false 
c  in DIMACS:
 21041 -21042 -21043  0
c  -3 does not represent an automaton state.
c    -( b^{157, 5}_2 ∧  b^{157, 5}_1 ∧  b^{157, 5}_0 ∧ true) 
c  in CNF:
c    -b^{157, 5}_2 ∨ -b^{157, 5}_1 ∨ -b^{157, 5}_0 ∨ false 
c  in DIMACS:
-21041 -21042 -21043  0

c i = 6
c  -2+1 --> -1
c    ( b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧  p_942) -> ( b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0)
c  in CNF:
c    -b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨  b^{157, 7}_2
c    -b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_1
c    -b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨  b^{157, 7}_0
c  in DIMACS:
-21044 -21045  21046 -942  21047 0
-21044 -21045  21046 -942 -21048 0
-21044 -21045  21046 -942  21049 0

c  -1+1 --> 0
c    ( b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0 ∧  p_942) -> (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧ -b^{157, 7}_0)
c  in CNF:
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_2
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_1
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_0
c  in DIMACS:
-21044  21045 -21046 -942 -21047 0
-21044  21045 -21046 -942 -21048 0
-21044  21045 -21046 -942 -21049 0

c  0+1 --> 1
c    (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧  p_942) -> (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0)
c  in CNF:
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_2
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_1
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨  b^{157, 7}_0
c  in DIMACS:
 21044  21045  21046 -942 -21047 0
 21044  21045  21046 -942 -21048 0
 21044  21045  21046 -942  21049 0

c  1+1 --> 2
c    (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0 ∧  p_942) -> (-b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0)
c  in CNF:
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_2
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨  b^{157, 7}_1
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ -p_942 ∨ -b^{157, 7}_0
c  in DIMACS:
 21044  21045 -21046 -942 -21047 0
 21044  21045 -21046 -942  21048 0
 21044  21045 -21046 -942 -21049 0

c  2+1 --> break 
c    (-b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧  p_942) -> break
c  in CNF:
c     b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 21044 -21045  21046 -942 1162 0


c  2-1 --> 1
c    (-b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧ -p_942) -> (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0)
c  in CNF:
c     b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_2
c     b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_1
c     b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨  b^{157, 7}_0
c  in DIMACS:
 21044 -21045  21046  942 -21047 0
 21044 -21045  21046  942 -21048 0
 21044 -21045  21046  942  21049 0

c  1-1 --> 0
c    (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0 ∧ -p_942) -> (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧ -b^{157, 7}_0)
c  in CNF:
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_2
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_1
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_0
c  in DIMACS:
 21044  21045 -21046  942 -21047 0
 21044  21045 -21046  942 -21048 0
 21044  21045 -21046  942 -21049 0

c  0-1 --> -1
c    (-b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧ -p_942) -> ( b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0)
c  in CNF:
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨  b^{157, 7}_2
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_1
c     b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨  b^{157, 7}_0
c  in DIMACS:
 21044  21045  21046  942  21047 0
 21044  21045  21046  942 -21048 0
 21044  21045  21046  942  21049 0

c  -1-1 --> -2
c    ( b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧  b^{157, 6}_0 ∧ -p_942) -> ( b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0)
c  in CNF:
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨  b^{157, 7}_2
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨  b^{157, 7}_1
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨  p_942 ∨ -b^{157, 7}_0
c  in DIMACS:
-21044  21045 -21046  942  21047 0
-21044  21045 -21046  942  21048 0
-21044  21045 -21046  942 -21049 0

c  -2-1 --> break 
c    ( b^{157, 6}_2 ∧  b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨  b^{157, 6}_0 ∨  p_942 ∨ break
c  in DIMACS:
-21044 -21045  21046  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 6}_2 ∧ -b^{157, 6}_1 ∧ -b^{157, 6}_0 ∧ true) 
c  in CNF:
c    -b^{157, 6}_2 ∨  b^{157, 6}_1 ∨  b^{157, 6}_0 ∨ false 
c  in DIMACS:
-21044  21045  21046  0

c  3 does not represent an automaton state.
c    -(-b^{157, 6}_2 ∧  b^{157, 6}_1 ∧  b^{157, 6}_0 ∧ true) 
c  in CNF:
c     b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ false 
c  in DIMACS:
 21044 -21045 -21046  0
c  -3 does not represent an automaton state.
c    -( b^{157, 6}_2 ∧  b^{157, 6}_1 ∧  b^{157, 6}_0 ∧ true) 
c  in CNF:
c    -b^{157, 6}_2 ∨ -b^{157, 6}_1 ∨ -b^{157, 6}_0 ∨ false 
c  in DIMACS:
-21044 -21045 -21046  0

c i = 7
c  -2+1 --> -1
c    ( b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧  p_1099) -> ( b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧  b^{157, 8}_0)
c  in CNF:
c    -b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨  b^{157, 8}_2
c    -b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_1
c    -b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨  b^{157, 8}_0
c  in DIMACS:
-21047 -21048  21049 -1099  21050 0
-21047 -21048  21049 -1099 -21051 0
-21047 -21048  21049 -1099  21052 0

c  -1+1 --> 0
c    ( b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0 ∧  p_1099) -> (-b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧ -b^{157, 8}_0)
c  in CNF:
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_2
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_1
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_0
c  in DIMACS:
-21047  21048 -21049 -1099 -21050 0
-21047  21048 -21049 -1099 -21051 0
-21047  21048 -21049 -1099 -21052 0

c  0+1 --> 1
c    (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧  p_1099) -> (-b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧  b^{157, 8}_0)
c  in CNF:
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_2
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_1
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨  b^{157, 8}_0
c  in DIMACS:
 21047  21048  21049 -1099 -21050 0
 21047  21048  21049 -1099 -21051 0
 21047  21048  21049 -1099  21052 0

c  1+1 --> 2
c    (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0 ∧  p_1099) -> (-b^{157, 8}_2 ∧  b^{157, 8}_1 ∧ -b^{157, 8}_0)
c  in CNF:
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_2
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨  b^{157, 8}_1
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ -p_1099 ∨ -b^{157, 8}_0
c  in DIMACS:
 21047  21048 -21049 -1099 -21050 0
 21047  21048 -21049 -1099  21051 0
 21047  21048 -21049 -1099 -21052 0

c  2+1 --> break 
c    (-b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧  p_1099) -> break
c  in CNF:
c     b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ -p_1099 ∨ break
c  in DIMACS:
 21047 -21048  21049 -1099 1162 0


c  2-1 --> 1
c    (-b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧ -p_1099) -> (-b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧  b^{157, 8}_0)
c  in CNF:
c     b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_2
c     b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_1
c     b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨  b^{157, 8}_0
c  in DIMACS:
 21047 -21048  21049  1099 -21050 0
 21047 -21048  21049  1099 -21051 0
 21047 -21048  21049  1099  21052 0

c  1-1 --> 0
c    (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0 ∧ -p_1099) -> (-b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧ -b^{157, 8}_0)
c  in CNF:
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_2
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_1
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_0
c  in DIMACS:
 21047  21048 -21049  1099 -21050 0
 21047  21048 -21049  1099 -21051 0
 21047  21048 -21049  1099 -21052 0

c  0-1 --> -1
c    (-b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧ -p_1099) -> ( b^{157, 8}_2 ∧ -b^{157, 8}_1 ∧  b^{157, 8}_0)
c  in CNF:
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨  b^{157, 8}_2
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_1
c     b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨  b^{157, 8}_0
c  in DIMACS:
 21047  21048  21049  1099  21050 0
 21047  21048  21049  1099 -21051 0
 21047  21048  21049  1099  21052 0

c  -1-1 --> -2
c    ( b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧  b^{157, 7}_0 ∧ -p_1099) -> ( b^{157, 8}_2 ∧  b^{157, 8}_1 ∧ -b^{157, 8}_0)
c  in CNF:
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨  b^{157, 8}_2
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨  b^{157, 8}_1
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨  p_1099 ∨ -b^{157, 8}_0
c  in DIMACS:
-21047  21048 -21049  1099  21050 0
-21047  21048 -21049  1099  21051 0
-21047  21048 -21049  1099 -21052 0

c  -2-1 --> break 
c    ( b^{157, 7}_2 ∧  b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧ -p_1099) -> break
c  in CNF:
c    -b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨  b^{157, 7}_0 ∨  p_1099 ∨ break
c  in DIMACS:
-21047 -21048  21049  1099 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{157, 7}_2 ∧ -b^{157, 7}_1 ∧ -b^{157, 7}_0 ∧ true) 
c  in CNF:
c    -b^{157, 7}_2 ∨  b^{157, 7}_1 ∨  b^{157, 7}_0 ∨ false 
c  in DIMACS:
-21047  21048  21049  0

c  3 does not represent an automaton state.
c    -(-b^{157, 7}_2 ∧  b^{157, 7}_1 ∧  b^{157, 7}_0 ∧ true) 
c  in CNF:
c     b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ false 
c  in DIMACS:
 21047 -21048 -21049  0
c  -3 does not represent an automaton state.
c    -( b^{157, 7}_2 ∧  b^{157, 7}_1 ∧  b^{157, 7}_0 ∧ true) 
c  in CNF:
c    -b^{157, 7}_2 ∨ -b^{157, 7}_1 ∨ -b^{157, 7}_0 ∨ false 
c  in DIMACS:
-21047 -21048 -21049  0

c INIT for k = 158
c    -b^{158, 1}_2
c    -b^{158, 1}_1
c    -b^{158, 1}_0
c  in DIMACS:
-21053 0
-21054 0
-21055 0

c Transitions for k = 158
c i = 1
c  -2+1 --> -1
c    ( b^{158, 1}_2 ∧  b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧  p_158) -> ( b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0)
c  in CNF:
c    -b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨  b^{158, 2}_2
c    -b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_1
c    -b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨  b^{158, 2}_0
c  in DIMACS:
-21053 -21054  21055 -158  21056 0
-21053 -21054  21055 -158 -21057 0
-21053 -21054  21055 -158  21058 0

c  -1+1 --> 0
c    ( b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧  b^{158, 1}_0 ∧  p_158) -> (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧ -b^{158, 2}_0)
c  in CNF:
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_2
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_1
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_0
c  in DIMACS:
-21053  21054 -21055 -158 -21056 0
-21053  21054 -21055 -158 -21057 0
-21053  21054 -21055 -158 -21058 0

c  0+1 --> 1
c    (-b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧  p_158) -> (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0)
c  in CNF:
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_2
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_1
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨  b^{158, 2}_0
c  in DIMACS:
 21053  21054  21055 -158 -21056 0
 21053  21054  21055 -158 -21057 0
 21053  21054  21055 -158  21058 0

c  1+1 --> 2
c    (-b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧  b^{158, 1}_0 ∧  p_158) -> (-b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0)
c  in CNF:
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_2
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨  b^{158, 2}_1
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ -p_158 ∨ -b^{158, 2}_0
c  in DIMACS:
 21053  21054 -21055 -158 -21056 0
 21053  21054 -21055 -158  21057 0
 21053  21054 -21055 -158 -21058 0

c  2+1 --> break 
c    (-b^{158, 1}_2 ∧  b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧  p_158) -> break
c  in CNF:
c     b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ -p_158 ∨ break
c  in DIMACS:
 21053 -21054  21055 -158 1162 0


c  2-1 --> 1
c    (-b^{158, 1}_2 ∧  b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧ -p_158) -> (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0)
c  in CNF:
c     b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_2
c     b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_1
c     b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨  b^{158, 2}_0
c  in DIMACS:
 21053 -21054  21055  158 -21056 0
 21053 -21054  21055  158 -21057 0
 21053 -21054  21055  158  21058 0

c  1-1 --> 0
c    (-b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧  b^{158, 1}_0 ∧ -p_158) -> (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧ -b^{158, 2}_0)
c  in CNF:
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_2
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_1
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_0
c  in DIMACS:
 21053  21054 -21055  158 -21056 0
 21053  21054 -21055  158 -21057 0
 21053  21054 -21055  158 -21058 0

c  0-1 --> -1
c    (-b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧ -p_158) -> ( b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0)
c  in CNF:
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨  b^{158, 2}_2
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_1
c     b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨  b^{158, 2}_0
c  in DIMACS:
 21053  21054  21055  158  21056 0
 21053  21054  21055  158 -21057 0
 21053  21054  21055  158  21058 0

c  -1-1 --> -2
c    ( b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧  b^{158, 1}_0 ∧ -p_158) -> ( b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0)
c  in CNF:
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨  b^{158, 2}_2
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨  b^{158, 2}_1
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨  p_158 ∨ -b^{158, 2}_0
c  in DIMACS:
-21053  21054 -21055  158  21056 0
-21053  21054 -21055  158  21057 0
-21053  21054 -21055  158 -21058 0

c  -2-1 --> break 
c    ( b^{158, 1}_2 ∧  b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧ -p_158) -> break
c  in CNF:
c    -b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨  b^{158, 1}_0 ∨  p_158 ∨ break
c  in DIMACS:
-21053 -21054  21055  158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 1}_2 ∧ -b^{158, 1}_1 ∧ -b^{158, 1}_0 ∧ true) 
c  in CNF:
c    -b^{158, 1}_2 ∨  b^{158, 1}_1 ∨  b^{158, 1}_0 ∨ false 
c  in DIMACS:
-21053  21054  21055  0

c  3 does not represent an automaton state.
c    -(-b^{158, 1}_2 ∧  b^{158, 1}_1 ∧  b^{158, 1}_0 ∧ true) 
c  in CNF:
c     b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ false 
c  in DIMACS:
 21053 -21054 -21055  0
c  -3 does not represent an automaton state.
c    -( b^{158, 1}_2 ∧  b^{158, 1}_1 ∧  b^{158, 1}_0 ∧ true) 
c  in CNF:
c    -b^{158, 1}_2 ∨ -b^{158, 1}_1 ∨ -b^{158, 1}_0 ∨ false 
c  in DIMACS:
-21053 -21054 -21055  0

c i = 2
c  -2+1 --> -1
c    ( b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧  p_316) -> ( b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0)
c  in CNF:
c    -b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨  b^{158, 3}_2
c    -b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_1
c    -b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨  b^{158, 3}_0
c  in DIMACS:
-21056 -21057  21058 -316  21059 0
-21056 -21057  21058 -316 -21060 0
-21056 -21057  21058 -316  21061 0

c  -1+1 --> 0
c    ( b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0 ∧  p_316) -> (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧ -b^{158, 3}_0)
c  in CNF:
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_2
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_1
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_0
c  in DIMACS:
-21056  21057 -21058 -316 -21059 0
-21056  21057 -21058 -316 -21060 0
-21056  21057 -21058 -316 -21061 0

c  0+1 --> 1
c    (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧  p_316) -> (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0)
c  in CNF:
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_2
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_1
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨  b^{158, 3}_0
c  in DIMACS:
 21056  21057  21058 -316 -21059 0
 21056  21057  21058 -316 -21060 0
 21056  21057  21058 -316  21061 0

c  1+1 --> 2
c    (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0 ∧  p_316) -> (-b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0)
c  in CNF:
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_2
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨  b^{158, 3}_1
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ -p_316 ∨ -b^{158, 3}_0
c  in DIMACS:
 21056  21057 -21058 -316 -21059 0
 21056  21057 -21058 -316  21060 0
 21056  21057 -21058 -316 -21061 0

c  2+1 --> break 
c    (-b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧  p_316) -> break
c  in CNF:
c     b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 21056 -21057  21058 -316 1162 0


c  2-1 --> 1
c    (-b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧ -p_316) -> (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0)
c  in CNF:
c     b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_2
c     b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_1
c     b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨  b^{158, 3}_0
c  in DIMACS:
 21056 -21057  21058  316 -21059 0
 21056 -21057  21058  316 -21060 0
 21056 -21057  21058  316  21061 0

c  1-1 --> 0
c    (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0 ∧ -p_316) -> (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧ -b^{158, 3}_0)
c  in CNF:
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_2
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_1
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_0
c  in DIMACS:
 21056  21057 -21058  316 -21059 0
 21056  21057 -21058  316 -21060 0
 21056  21057 -21058  316 -21061 0

c  0-1 --> -1
c    (-b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧ -p_316) -> ( b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0)
c  in CNF:
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨  b^{158, 3}_2
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_1
c     b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨  b^{158, 3}_0
c  in DIMACS:
 21056  21057  21058  316  21059 0
 21056  21057  21058  316 -21060 0
 21056  21057  21058  316  21061 0

c  -1-1 --> -2
c    ( b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧  b^{158, 2}_0 ∧ -p_316) -> ( b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0)
c  in CNF:
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨  b^{158, 3}_2
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨  b^{158, 3}_1
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨  p_316 ∨ -b^{158, 3}_0
c  in DIMACS:
-21056  21057 -21058  316  21059 0
-21056  21057 -21058  316  21060 0
-21056  21057 -21058  316 -21061 0

c  -2-1 --> break 
c    ( b^{158, 2}_2 ∧  b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨  b^{158, 2}_0 ∨  p_316 ∨ break
c  in DIMACS:
-21056 -21057  21058  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 2}_2 ∧ -b^{158, 2}_1 ∧ -b^{158, 2}_0 ∧ true) 
c  in CNF:
c    -b^{158, 2}_2 ∨  b^{158, 2}_1 ∨  b^{158, 2}_0 ∨ false 
c  in DIMACS:
-21056  21057  21058  0

c  3 does not represent an automaton state.
c    -(-b^{158, 2}_2 ∧  b^{158, 2}_1 ∧  b^{158, 2}_0 ∧ true) 
c  in CNF:
c     b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ false 
c  in DIMACS:
 21056 -21057 -21058  0
c  -3 does not represent an automaton state.
c    -( b^{158, 2}_2 ∧  b^{158, 2}_1 ∧  b^{158, 2}_0 ∧ true) 
c  in CNF:
c    -b^{158, 2}_2 ∨ -b^{158, 2}_1 ∨ -b^{158, 2}_0 ∨ false 
c  in DIMACS:
-21056 -21057 -21058  0

c i = 3
c  -2+1 --> -1
c    ( b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧  p_474) -> ( b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0)
c  in CNF:
c    -b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨  b^{158, 4}_2
c    -b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_1
c    -b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨  b^{158, 4}_0
c  in DIMACS:
-21059 -21060  21061 -474  21062 0
-21059 -21060  21061 -474 -21063 0
-21059 -21060  21061 -474  21064 0

c  -1+1 --> 0
c    ( b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0 ∧  p_474) -> (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧ -b^{158, 4}_0)
c  in CNF:
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_2
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_1
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_0
c  in DIMACS:
-21059  21060 -21061 -474 -21062 0
-21059  21060 -21061 -474 -21063 0
-21059  21060 -21061 -474 -21064 0

c  0+1 --> 1
c    (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧  p_474) -> (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0)
c  in CNF:
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_2
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_1
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨  b^{158, 4}_0
c  in DIMACS:
 21059  21060  21061 -474 -21062 0
 21059  21060  21061 -474 -21063 0
 21059  21060  21061 -474  21064 0

c  1+1 --> 2
c    (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0 ∧  p_474) -> (-b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0)
c  in CNF:
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_2
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨  b^{158, 4}_1
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ -p_474 ∨ -b^{158, 4}_0
c  in DIMACS:
 21059  21060 -21061 -474 -21062 0
 21059  21060 -21061 -474  21063 0
 21059  21060 -21061 -474 -21064 0

c  2+1 --> break 
c    (-b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧  p_474) -> break
c  in CNF:
c     b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 21059 -21060  21061 -474 1162 0


c  2-1 --> 1
c    (-b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧ -p_474) -> (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0)
c  in CNF:
c     b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_2
c     b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_1
c     b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨  b^{158, 4}_0
c  in DIMACS:
 21059 -21060  21061  474 -21062 0
 21059 -21060  21061  474 -21063 0
 21059 -21060  21061  474  21064 0

c  1-1 --> 0
c    (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0 ∧ -p_474) -> (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧ -b^{158, 4}_0)
c  in CNF:
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_2
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_1
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_0
c  in DIMACS:
 21059  21060 -21061  474 -21062 0
 21059  21060 -21061  474 -21063 0
 21059  21060 -21061  474 -21064 0

c  0-1 --> -1
c    (-b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧ -p_474) -> ( b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0)
c  in CNF:
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨  b^{158, 4}_2
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_1
c     b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨  b^{158, 4}_0
c  in DIMACS:
 21059  21060  21061  474  21062 0
 21059  21060  21061  474 -21063 0
 21059  21060  21061  474  21064 0

c  -1-1 --> -2
c    ( b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧  b^{158, 3}_0 ∧ -p_474) -> ( b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0)
c  in CNF:
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨  b^{158, 4}_2
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨  b^{158, 4}_1
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨  p_474 ∨ -b^{158, 4}_0
c  in DIMACS:
-21059  21060 -21061  474  21062 0
-21059  21060 -21061  474  21063 0
-21059  21060 -21061  474 -21064 0

c  -2-1 --> break 
c    ( b^{158, 3}_2 ∧  b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨  b^{158, 3}_0 ∨  p_474 ∨ break
c  in DIMACS:
-21059 -21060  21061  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 3}_2 ∧ -b^{158, 3}_1 ∧ -b^{158, 3}_0 ∧ true) 
c  in CNF:
c    -b^{158, 3}_2 ∨  b^{158, 3}_1 ∨  b^{158, 3}_0 ∨ false 
c  in DIMACS:
-21059  21060  21061  0

c  3 does not represent an automaton state.
c    -(-b^{158, 3}_2 ∧  b^{158, 3}_1 ∧  b^{158, 3}_0 ∧ true) 
c  in CNF:
c     b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ false 
c  in DIMACS:
 21059 -21060 -21061  0
c  -3 does not represent an automaton state.
c    -( b^{158, 3}_2 ∧  b^{158, 3}_1 ∧  b^{158, 3}_0 ∧ true) 
c  in CNF:
c    -b^{158, 3}_2 ∨ -b^{158, 3}_1 ∨ -b^{158, 3}_0 ∨ false 
c  in DIMACS:
-21059 -21060 -21061  0

c i = 4
c  -2+1 --> -1
c    ( b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧  p_632) -> ( b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0)
c  in CNF:
c    -b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨  b^{158, 5}_2
c    -b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_1
c    -b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨  b^{158, 5}_0
c  in DIMACS:
-21062 -21063  21064 -632  21065 0
-21062 -21063  21064 -632 -21066 0
-21062 -21063  21064 -632  21067 0

c  -1+1 --> 0
c    ( b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0 ∧  p_632) -> (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧ -b^{158, 5}_0)
c  in CNF:
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_2
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_1
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_0
c  in DIMACS:
-21062  21063 -21064 -632 -21065 0
-21062  21063 -21064 -632 -21066 0
-21062  21063 -21064 -632 -21067 0

c  0+1 --> 1
c    (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧  p_632) -> (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0)
c  in CNF:
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_2
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_1
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨  b^{158, 5}_0
c  in DIMACS:
 21062  21063  21064 -632 -21065 0
 21062  21063  21064 -632 -21066 0
 21062  21063  21064 -632  21067 0

c  1+1 --> 2
c    (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0 ∧  p_632) -> (-b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0)
c  in CNF:
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_2
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨  b^{158, 5}_1
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ -p_632 ∨ -b^{158, 5}_0
c  in DIMACS:
 21062  21063 -21064 -632 -21065 0
 21062  21063 -21064 -632  21066 0
 21062  21063 -21064 -632 -21067 0

c  2+1 --> break 
c    (-b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧  p_632) -> break
c  in CNF:
c     b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 21062 -21063  21064 -632 1162 0


c  2-1 --> 1
c    (-b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧ -p_632) -> (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0)
c  in CNF:
c     b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_2
c     b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_1
c     b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨  b^{158, 5}_0
c  in DIMACS:
 21062 -21063  21064  632 -21065 0
 21062 -21063  21064  632 -21066 0
 21062 -21063  21064  632  21067 0

c  1-1 --> 0
c    (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0 ∧ -p_632) -> (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧ -b^{158, 5}_0)
c  in CNF:
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_2
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_1
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_0
c  in DIMACS:
 21062  21063 -21064  632 -21065 0
 21062  21063 -21064  632 -21066 0
 21062  21063 -21064  632 -21067 0

c  0-1 --> -1
c    (-b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧ -p_632) -> ( b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0)
c  in CNF:
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨  b^{158, 5}_2
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_1
c     b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨  b^{158, 5}_0
c  in DIMACS:
 21062  21063  21064  632  21065 0
 21062  21063  21064  632 -21066 0
 21062  21063  21064  632  21067 0

c  -1-1 --> -2
c    ( b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧  b^{158, 4}_0 ∧ -p_632) -> ( b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0)
c  in CNF:
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨  b^{158, 5}_2
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨  b^{158, 5}_1
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨  p_632 ∨ -b^{158, 5}_0
c  in DIMACS:
-21062  21063 -21064  632  21065 0
-21062  21063 -21064  632  21066 0
-21062  21063 -21064  632 -21067 0

c  -2-1 --> break 
c    ( b^{158, 4}_2 ∧  b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨  b^{158, 4}_0 ∨  p_632 ∨ break
c  in DIMACS:
-21062 -21063  21064  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 4}_2 ∧ -b^{158, 4}_1 ∧ -b^{158, 4}_0 ∧ true) 
c  in CNF:
c    -b^{158, 4}_2 ∨  b^{158, 4}_1 ∨  b^{158, 4}_0 ∨ false 
c  in DIMACS:
-21062  21063  21064  0

c  3 does not represent an automaton state.
c    -(-b^{158, 4}_2 ∧  b^{158, 4}_1 ∧  b^{158, 4}_0 ∧ true) 
c  in CNF:
c     b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ false 
c  in DIMACS:
 21062 -21063 -21064  0
c  -3 does not represent an automaton state.
c    -( b^{158, 4}_2 ∧  b^{158, 4}_1 ∧  b^{158, 4}_0 ∧ true) 
c  in CNF:
c    -b^{158, 4}_2 ∨ -b^{158, 4}_1 ∨ -b^{158, 4}_0 ∨ false 
c  in DIMACS:
-21062 -21063 -21064  0

c i = 5
c  -2+1 --> -1
c    ( b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧  p_790) -> ( b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0)
c  in CNF:
c    -b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨  b^{158, 6}_2
c    -b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_1
c    -b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨  b^{158, 6}_0
c  in DIMACS:
-21065 -21066  21067 -790  21068 0
-21065 -21066  21067 -790 -21069 0
-21065 -21066  21067 -790  21070 0

c  -1+1 --> 0
c    ( b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0 ∧  p_790) -> (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧ -b^{158, 6}_0)
c  in CNF:
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_2
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_1
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_0
c  in DIMACS:
-21065  21066 -21067 -790 -21068 0
-21065  21066 -21067 -790 -21069 0
-21065  21066 -21067 -790 -21070 0

c  0+1 --> 1
c    (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧  p_790) -> (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0)
c  in CNF:
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_2
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_1
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨  b^{158, 6}_0
c  in DIMACS:
 21065  21066  21067 -790 -21068 0
 21065  21066  21067 -790 -21069 0
 21065  21066  21067 -790  21070 0

c  1+1 --> 2
c    (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0 ∧  p_790) -> (-b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0)
c  in CNF:
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_2
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨  b^{158, 6}_1
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ -p_790 ∨ -b^{158, 6}_0
c  in DIMACS:
 21065  21066 -21067 -790 -21068 0
 21065  21066 -21067 -790  21069 0
 21065  21066 -21067 -790 -21070 0

c  2+1 --> break 
c    (-b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧  p_790) -> break
c  in CNF:
c     b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ -p_790 ∨ break
c  in DIMACS:
 21065 -21066  21067 -790 1162 0


c  2-1 --> 1
c    (-b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧ -p_790) -> (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0)
c  in CNF:
c     b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_2
c     b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_1
c     b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨  b^{158, 6}_0
c  in DIMACS:
 21065 -21066  21067  790 -21068 0
 21065 -21066  21067  790 -21069 0
 21065 -21066  21067  790  21070 0

c  1-1 --> 0
c    (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0 ∧ -p_790) -> (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧ -b^{158, 6}_0)
c  in CNF:
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_2
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_1
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_0
c  in DIMACS:
 21065  21066 -21067  790 -21068 0
 21065  21066 -21067  790 -21069 0
 21065  21066 -21067  790 -21070 0

c  0-1 --> -1
c    (-b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧ -p_790) -> ( b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0)
c  in CNF:
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨  b^{158, 6}_2
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_1
c     b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨  b^{158, 6}_0
c  in DIMACS:
 21065  21066  21067  790  21068 0
 21065  21066  21067  790 -21069 0
 21065  21066  21067  790  21070 0

c  -1-1 --> -2
c    ( b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧  b^{158, 5}_0 ∧ -p_790) -> ( b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0)
c  in CNF:
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨  b^{158, 6}_2
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨  b^{158, 6}_1
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨  p_790 ∨ -b^{158, 6}_0
c  in DIMACS:
-21065  21066 -21067  790  21068 0
-21065  21066 -21067  790  21069 0
-21065  21066 -21067  790 -21070 0

c  -2-1 --> break 
c    ( b^{158, 5}_2 ∧  b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧ -p_790) -> break
c  in CNF:
c    -b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨  b^{158, 5}_0 ∨  p_790 ∨ break
c  in DIMACS:
-21065 -21066  21067  790 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 5}_2 ∧ -b^{158, 5}_1 ∧ -b^{158, 5}_0 ∧ true) 
c  in CNF:
c    -b^{158, 5}_2 ∨  b^{158, 5}_1 ∨  b^{158, 5}_0 ∨ false 
c  in DIMACS:
-21065  21066  21067  0

c  3 does not represent an automaton state.
c    -(-b^{158, 5}_2 ∧  b^{158, 5}_1 ∧  b^{158, 5}_0 ∧ true) 
c  in CNF:
c     b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ false 
c  in DIMACS:
 21065 -21066 -21067  0
c  -3 does not represent an automaton state.
c    -( b^{158, 5}_2 ∧  b^{158, 5}_1 ∧  b^{158, 5}_0 ∧ true) 
c  in CNF:
c    -b^{158, 5}_2 ∨ -b^{158, 5}_1 ∨ -b^{158, 5}_0 ∨ false 
c  in DIMACS:
-21065 -21066 -21067  0

c i = 6
c  -2+1 --> -1
c    ( b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧  p_948) -> ( b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0)
c  in CNF:
c    -b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨  b^{158, 7}_2
c    -b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_1
c    -b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨  b^{158, 7}_0
c  in DIMACS:
-21068 -21069  21070 -948  21071 0
-21068 -21069  21070 -948 -21072 0
-21068 -21069  21070 -948  21073 0

c  -1+1 --> 0
c    ( b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0 ∧  p_948) -> (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧ -b^{158, 7}_0)
c  in CNF:
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_2
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_1
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_0
c  in DIMACS:
-21068  21069 -21070 -948 -21071 0
-21068  21069 -21070 -948 -21072 0
-21068  21069 -21070 -948 -21073 0

c  0+1 --> 1
c    (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧  p_948) -> (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0)
c  in CNF:
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_2
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_1
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨  b^{158, 7}_0
c  in DIMACS:
 21068  21069  21070 -948 -21071 0
 21068  21069  21070 -948 -21072 0
 21068  21069  21070 -948  21073 0

c  1+1 --> 2
c    (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0 ∧  p_948) -> (-b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0)
c  in CNF:
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_2
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨  b^{158, 7}_1
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ -p_948 ∨ -b^{158, 7}_0
c  in DIMACS:
 21068  21069 -21070 -948 -21071 0
 21068  21069 -21070 -948  21072 0
 21068  21069 -21070 -948 -21073 0

c  2+1 --> break 
c    (-b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧  p_948) -> break
c  in CNF:
c     b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 21068 -21069  21070 -948 1162 0


c  2-1 --> 1
c    (-b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧ -p_948) -> (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0)
c  in CNF:
c     b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_2
c     b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_1
c     b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨  b^{158, 7}_0
c  in DIMACS:
 21068 -21069  21070  948 -21071 0
 21068 -21069  21070  948 -21072 0
 21068 -21069  21070  948  21073 0

c  1-1 --> 0
c    (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0 ∧ -p_948) -> (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧ -b^{158, 7}_0)
c  in CNF:
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_2
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_1
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_0
c  in DIMACS:
 21068  21069 -21070  948 -21071 0
 21068  21069 -21070  948 -21072 0
 21068  21069 -21070  948 -21073 0

c  0-1 --> -1
c    (-b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧ -p_948) -> ( b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0)
c  in CNF:
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨  b^{158, 7}_2
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_1
c     b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨  b^{158, 7}_0
c  in DIMACS:
 21068  21069  21070  948  21071 0
 21068  21069  21070  948 -21072 0
 21068  21069  21070  948  21073 0

c  -1-1 --> -2
c    ( b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧  b^{158, 6}_0 ∧ -p_948) -> ( b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0)
c  in CNF:
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨  b^{158, 7}_2
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨  b^{158, 7}_1
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨  p_948 ∨ -b^{158, 7}_0
c  in DIMACS:
-21068  21069 -21070  948  21071 0
-21068  21069 -21070  948  21072 0
-21068  21069 -21070  948 -21073 0

c  -2-1 --> break 
c    ( b^{158, 6}_2 ∧  b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨  b^{158, 6}_0 ∨  p_948 ∨ break
c  in DIMACS:
-21068 -21069  21070  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 6}_2 ∧ -b^{158, 6}_1 ∧ -b^{158, 6}_0 ∧ true) 
c  in CNF:
c    -b^{158, 6}_2 ∨  b^{158, 6}_1 ∨  b^{158, 6}_0 ∨ false 
c  in DIMACS:
-21068  21069  21070  0

c  3 does not represent an automaton state.
c    -(-b^{158, 6}_2 ∧  b^{158, 6}_1 ∧  b^{158, 6}_0 ∧ true) 
c  in CNF:
c     b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ false 
c  in DIMACS:
 21068 -21069 -21070  0
c  -3 does not represent an automaton state.
c    -( b^{158, 6}_2 ∧  b^{158, 6}_1 ∧  b^{158, 6}_0 ∧ true) 
c  in CNF:
c    -b^{158, 6}_2 ∨ -b^{158, 6}_1 ∨ -b^{158, 6}_0 ∨ false 
c  in DIMACS:
-21068 -21069 -21070  0

c i = 7
c  -2+1 --> -1
c    ( b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧  p_1106) -> ( b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧  b^{158, 8}_0)
c  in CNF:
c    -b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨  b^{158, 8}_2
c    -b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_1
c    -b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨  b^{158, 8}_0
c  in DIMACS:
-21071 -21072  21073 -1106  21074 0
-21071 -21072  21073 -1106 -21075 0
-21071 -21072  21073 -1106  21076 0

c  -1+1 --> 0
c    ( b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0 ∧  p_1106) -> (-b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧ -b^{158, 8}_0)
c  in CNF:
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_2
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_1
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_0
c  in DIMACS:
-21071  21072 -21073 -1106 -21074 0
-21071  21072 -21073 -1106 -21075 0
-21071  21072 -21073 -1106 -21076 0

c  0+1 --> 1
c    (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧  p_1106) -> (-b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧  b^{158, 8}_0)
c  in CNF:
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_2
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_1
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨  b^{158, 8}_0
c  in DIMACS:
 21071  21072  21073 -1106 -21074 0
 21071  21072  21073 -1106 -21075 0
 21071  21072  21073 -1106  21076 0

c  1+1 --> 2
c    (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0 ∧  p_1106) -> (-b^{158, 8}_2 ∧  b^{158, 8}_1 ∧ -b^{158, 8}_0)
c  in CNF:
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_2
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨  b^{158, 8}_1
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ -p_1106 ∨ -b^{158, 8}_0
c  in DIMACS:
 21071  21072 -21073 -1106 -21074 0
 21071  21072 -21073 -1106  21075 0
 21071  21072 -21073 -1106 -21076 0

c  2+1 --> break 
c    (-b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧  p_1106) -> break
c  in CNF:
c     b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ -p_1106 ∨ break
c  in DIMACS:
 21071 -21072  21073 -1106 1162 0


c  2-1 --> 1
c    (-b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧ -p_1106) -> (-b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧  b^{158, 8}_0)
c  in CNF:
c     b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_2
c     b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_1
c     b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨  b^{158, 8}_0
c  in DIMACS:
 21071 -21072  21073  1106 -21074 0
 21071 -21072  21073  1106 -21075 0
 21071 -21072  21073  1106  21076 0

c  1-1 --> 0
c    (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0 ∧ -p_1106) -> (-b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧ -b^{158, 8}_0)
c  in CNF:
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_2
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_1
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_0
c  in DIMACS:
 21071  21072 -21073  1106 -21074 0
 21071  21072 -21073  1106 -21075 0
 21071  21072 -21073  1106 -21076 0

c  0-1 --> -1
c    (-b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧ -p_1106) -> ( b^{158, 8}_2 ∧ -b^{158, 8}_1 ∧  b^{158, 8}_0)
c  in CNF:
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨  b^{158, 8}_2
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_1
c     b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨  b^{158, 8}_0
c  in DIMACS:
 21071  21072  21073  1106  21074 0
 21071  21072  21073  1106 -21075 0
 21071  21072  21073  1106  21076 0

c  -1-1 --> -2
c    ( b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧  b^{158, 7}_0 ∧ -p_1106) -> ( b^{158, 8}_2 ∧  b^{158, 8}_1 ∧ -b^{158, 8}_0)
c  in CNF:
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨  b^{158, 8}_2
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨  b^{158, 8}_1
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨  p_1106 ∨ -b^{158, 8}_0
c  in DIMACS:
-21071  21072 -21073  1106  21074 0
-21071  21072 -21073  1106  21075 0
-21071  21072 -21073  1106 -21076 0

c  -2-1 --> break 
c    ( b^{158, 7}_2 ∧  b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧ -p_1106) -> break
c  in CNF:
c    -b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨  b^{158, 7}_0 ∨  p_1106 ∨ break
c  in DIMACS:
-21071 -21072  21073  1106 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{158, 7}_2 ∧ -b^{158, 7}_1 ∧ -b^{158, 7}_0 ∧ true) 
c  in CNF:
c    -b^{158, 7}_2 ∨  b^{158, 7}_1 ∨  b^{158, 7}_0 ∨ false 
c  in DIMACS:
-21071  21072  21073  0

c  3 does not represent an automaton state.
c    -(-b^{158, 7}_2 ∧  b^{158, 7}_1 ∧  b^{158, 7}_0 ∧ true) 
c  in CNF:
c     b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ false 
c  in DIMACS:
 21071 -21072 -21073  0
c  -3 does not represent an automaton state.
c    -( b^{158, 7}_2 ∧  b^{158, 7}_1 ∧  b^{158, 7}_0 ∧ true) 
c  in CNF:
c    -b^{158, 7}_2 ∨ -b^{158, 7}_1 ∨ -b^{158, 7}_0 ∨ false 
c  in DIMACS:
-21071 -21072 -21073  0

c INIT for k = 159
c    -b^{159, 1}_2
c    -b^{159, 1}_1
c    -b^{159, 1}_0
c  in DIMACS:
-21077 0
-21078 0
-21079 0

c Transitions for k = 159
c i = 1
c  -2+1 --> -1
c    ( b^{159, 1}_2 ∧  b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧  p_159) -> ( b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0)
c  in CNF:
c    -b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨  b^{159, 2}_2
c    -b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_1
c    -b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨  b^{159, 2}_0
c  in DIMACS:
-21077 -21078  21079 -159  21080 0
-21077 -21078  21079 -159 -21081 0
-21077 -21078  21079 -159  21082 0

c  -1+1 --> 0
c    ( b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧  b^{159, 1}_0 ∧  p_159) -> (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧ -b^{159, 2}_0)
c  in CNF:
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_2
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_1
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_0
c  in DIMACS:
-21077  21078 -21079 -159 -21080 0
-21077  21078 -21079 -159 -21081 0
-21077  21078 -21079 -159 -21082 0

c  0+1 --> 1
c    (-b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧  p_159) -> (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0)
c  in CNF:
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_2
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_1
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨  b^{159, 2}_0
c  in DIMACS:
 21077  21078  21079 -159 -21080 0
 21077  21078  21079 -159 -21081 0
 21077  21078  21079 -159  21082 0

c  1+1 --> 2
c    (-b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧  b^{159, 1}_0 ∧  p_159) -> (-b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0)
c  in CNF:
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_2
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨  b^{159, 2}_1
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ -p_159 ∨ -b^{159, 2}_0
c  in DIMACS:
 21077  21078 -21079 -159 -21080 0
 21077  21078 -21079 -159  21081 0
 21077  21078 -21079 -159 -21082 0

c  2+1 --> break 
c    (-b^{159, 1}_2 ∧  b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧  p_159) -> break
c  in CNF:
c     b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ -p_159 ∨ break
c  in DIMACS:
 21077 -21078  21079 -159 1162 0


c  2-1 --> 1
c    (-b^{159, 1}_2 ∧  b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧ -p_159) -> (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0)
c  in CNF:
c     b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_2
c     b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_1
c     b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨  b^{159, 2}_0
c  in DIMACS:
 21077 -21078  21079  159 -21080 0
 21077 -21078  21079  159 -21081 0
 21077 -21078  21079  159  21082 0

c  1-1 --> 0
c    (-b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧  b^{159, 1}_0 ∧ -p_159) -> (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧ -b^{159, 2}_0)
c  in CNF:
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_2
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_1
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_0
c  in DIMACS:
 21077  21078 -21079  159 -21080 0
 21077  21078 -21079  159 -21081 0
 21077  21078 -21079  159 -21082 0

c  0-1 --> -1
c    (-b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧ -p_159) -> ( b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0)
c  in CNF:
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨  b^{159, 2}_2
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_1
c     b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨  b^{159, 2}_0
c  in DIMACS:
 21077  21078  21079  159  21080 0
 21077  21078  21079  159 -21081 0
 21077  21078  21079  159  21082 0

c  -1-1 --> -2
c    ( b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧  b^{159, 1}_0 ∧ -p_159) -> ( b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0)
c  in CNF:
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨  b^{159, 2}_2
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨  b^{159, 2}_1
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨  p_159 ∨ -b^{159, 2}_0
c  in DIMACS:
-21077  21078 -21079  159  21080 0
-21077  21078 -21079  159  21081 0
-21077  21078 -21079  159 -21082 0

c  -2-1 --> break 
c    ( b^{159, 1}_2 ∧  b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧ -p_159) -> break
c  in CNF:
c    -b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨  b^{159, 1}_0 ∨  p_159 ∨ break
c  in DIMACS:
-21077 -21078  21079  159 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 1}_2 ∧ -b^{159, 1}_1 ∧ -b^{159, 1}_0 ∧ true) 
c  in CNF:
c    -b^{159, 1}_2 ∨  b^{159, 1}_1 ∨  b^{159, 1}_0 ∨ false 
c  in DIMACS:
-21077  21078  21079  0

c  3 does not represent an automaton state.
c    -(-b^{159, 1}_2 ∧  b^{159, 1}_1 ∧  b^{159, 1}_0 ∧ true) 
c  in CNF:
c     b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ false 
c  in DIMACS:
 21077 -21078 -21079  0
c  -3 does not represent an automaton state.
c    -( b^{159, 1}_2 ∧  b^{159, 1}_1 ∧  b^{159, 1}_0 ∧ true) 
c  in CNF:
c    -b^{159, 1}_2 ∨ -b^{159, 1}_1 ∨ -b^{159, 1}_0 ∨ false 
c  in DIMACS:
-21077 -21078 -21079  0

c i = 2
c  -2+1 --> -1
c    ( b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧  p_318) -> ( b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0)
c  in CNF:
c    -b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨  b^{159, 3}_2
c    -b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_1
c    -b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨  b^{159, 3}_0
c  in DIMACS:
-21080 -21081  21082 -318  21083 0
-21080 -21081  21082 -318 -21084 0
-21080 -21081  21082 -318  21085 0

c  -1+1 --> 0
c    ( b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0 ∧  p_318) -> (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧ -b^{159, 3}_0)
c  in CNF:
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_2
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_1
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_0
c  in DIMACS:
-21080  21081 -21082 -318 -21083 0
-21080  21081 -21082 -318 -21084 0
-21080  21081 -21082 -318 -21085 0

c  0+1 --> 1
c    (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧  p_318) -> (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0)
c  in CNF:
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_2
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_1
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨  b^{159, 3}_0
c  in DIMACS:
 21080  21081  21082 -318 -21083 0
 21080  21081  21082 -318 -21084 0
 21080  21081  21082 -318  21085 0

c  1+1 --> 2
c    (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0 ∧  p_318) -> (-b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0)
c  in CNF:
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_2
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨  b^{159, 3}_1
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ -p_318 ∨ -b^{159, 3}_0
c  in DIMACS:
 21080  21081 -21082 -318 -21083 0
 21080  21081 -21082 -318  21084 0
 21080  21081 -21082 -318 -21085 0

c  2+1 --> break 
c    (-b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧  p_318) -> break
c  in CNF:
c     b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 21080 -21081  21082 -318 1162 0


c  2-1 --> 1
c    (-b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧ -p_318) -> (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0)
c  in CNF:
c     b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_2
c     b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_1
c     b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨  b^{159, 3}_0
c  in DIMACS:
 21080 -21081  21082  318 -21083 0
 21080 -21081  21082  318 -21084 0
 21080 -21081  21082  318  21085 0

c  1-1 --> 0
c    (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0 ∧ -p_318) -> (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧ -b^{159, 3}_0)
c  in CNF:
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_2
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_1
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_0
c  in DIMACS:
 21080  21081 -21082  318 -21083 0
 21080  21081 -21082  318 -21084 0
 21080  21081 -21082  318 -21085 0

c  0-1 --> -1
c    (-b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧ -p_318) -> ( b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0)
c  in CNF:
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨  b^{159, 3}_2
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_1
c     b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨  b^{159, 3}_0
c  in DIMACS:
 21080  21081  21082  318  21083 0
 21080  21081  21082  318 -21084 0
 21080  21081  21082  318  21085 0

c  -1-1 --> -2
c    ( b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧  b^{159, 2}_0 ∧ -p_318) -> ( b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0)
c  in CNF:
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨  b^{159, 3}_2
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨  b^{159, 3}_1
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨  p_318 ∨ -b^{159, 3}_0
c  in DIMACS:
-21080  21081 -21082  318  21083 0
-21080  21081 -21082  318  21084 0
-21080  21081 -21082  318 -21085 0

c  -2-1 --> break 
c    ( b^{159, 2}_2 ∧  b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨  b^{159, 2}_0 ∨  p_318 ∨ break
c  in DIMACS:
-21080 -21081  21082  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 2}_2 ∧ -b^{159, 2}_1 ∧ -b^{159, 2}_0 ∧ true) 
c  in CNF:
c    -b^{159, 2}_2 ∨  b^{159, 2}_1 ∨  b^{159, 2}_0 ∨ false 
c  in DIMACS:
-21080  21081  21082  0

c  3 does not represent an automaton state.
c    -(-b^{159, 2}_2 ∧  b^{159, 2}_1 ∧  b^{159, 2}_0 ∧ true) 
c  in CNF:
c     b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ false 
c  in DIMACS:
 21080 -21081 -21082  0
c  -3 does not represent an automaton state.
c    -( b^{159, 2}_2 ∧  b^{159, 2}_1 ∧  b^{159, 2}_0 ∧ true) 
c  in CNF:
c    -b^{159, 2}_2 ∨ -b^{159, 2}_1 ∨ -b^{159, 2}_0 ∨ false 
c  in DIMACS:
-21080 -21081 -21082  0

c i = 3
c  -2+1 --> -1
c    ( b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧  p_477) -> ( b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0)
c  in CNF:
c    -b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨  b^{159, 4}_2
c    -b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_1
c    -b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨  b^{159, 4}_0
c  in DIMACS:
-21083 -21084  21085 -477  21086 0
-21083 -21084  21085 -477 -21087 0
-21083 -21084  21085 -477  21088 0

c  -1+1 --> 0
c    ( b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0 ∧  p_477) -> (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧ -b^{159, 4}_0)
c  in CNF:
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_2
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_1
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_0
c  in DIMACS:
-21083  21084 -21085 -477 -21086 0
-21083  21084 -21085 -477 -21087 0
-21083  21084 -21085 -477 -21088 0

c  0+1 --> 1
c    (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧  p_477) -> (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0)
c  in CNF:
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_2
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_1
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨  b^{159, 4}_0
c  in DIMACS:
 21083  21084  21085 -477 -21086 0
 21083  21084  21085 -477 -21087 0
 21083  21084  21085 -477  21088 0

c  1+1 --> 2
c    (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0 ∧  p_477) -> (-b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0)
c  in CNF:
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_2
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨  b^{159, 4}_1
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ -p_477 ∨ -b^{159, 4}_0
c  in DIMACS:
 21083  21084 -21085 -477 -21086 0
 21083  21084 -21085 -477  21087 0
 21083  21084 -21085 -477 -21088 0

c  2+1 --> break 
c    (-b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧  p_477) -> break
c  in CNF:
c     b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ -p_477 ∨ break
c  in DIMACS:
 21083 -21084  21085 -477 1162 0


c  2-1 --> 1
c    (-b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧ -p_477) -> (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0)
c  in CNF:
c     b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_2
c     b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_1
c     b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨  b^{159, 4}_0
c  in DIMACS:
 21083 -21084  21085  477 -21086 0
 21083 -21084  21085  477 -21087 0
 21083 -21084  21085  477  21088 0

c  1-1 --> 0
c    (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0 ∧ -p_477) -> (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧ -b^{159, 4}_0)
c  in CNF:
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_2
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_1
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_0
c  in DIMACS:
 21083  21084 -21085  477 -21086 0
 21083  21084 -21085  477 -21087 0
 21083  21084 -21085  477 -21088 0

c  0-1 --> -1
c    (-b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧ -p_477) -> ( b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0)
c  in CNF:
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨  b^{159, 4}_2
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_1
c     b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨  b^{159, 4}_0
c  in DIMACS:
 21083  21084  21085  477  21086 0
 21083  21084  21085  477 -21087 0
 21083  21084  21085  477  21088 0

c  -1-1 --> -2
c    ( b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧  b^{159, 3}_0 ∧ -p_477) -> ( b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0)
c  in CNF:
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨  b^{159, 4}_2
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨  b^{159, 4}_1
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨  p_477 ∨ -b^{159, 4}_0
c  in DIMACS:
-21083  21084 -21085  477  21086 0
-21083  21084 -21085  477  21087 0
-21083  21084 -21085  477 -21088 0

c  -2-1 --> break 
c    ( b^{159, 3}_2 ∧  b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧ -p_477) -> break
c  in CNF:
c    -b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨  b^{159, 3}_0 ∨  p_477 ∨ break
c  in DIMACS:
-21083 -21084  21085  477 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 3}_2 ∧ -b^{159, 3}_1 ∧ -b^{159, 3}_0 ∧ true) 
c  in CNF:
c    -b^{159, 3}_2 ∨  b^{159, 3}_1 ∨  b^{159, 3}_0 ∨ false 
c  in DIMACS:
-21083  21084  21085  0

c  3 does not represent an automaton state.
c    -(-b^{159, 3}_2 ∧  b^{159, 3}_1 ∧  b^{159, 3}_0 ∧ true) 
c  in CNF:
c     b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ false 
c  in DIMACS:
 21083 -21084 -21085  0
c  -3 does not represent an automaton state.
c    -( b^{159, 3}_2 ∧  b^{159, 3}_1 ∧  b^{159, 3}_0 ∧ true) 
c  in CNF:
c    -b^{159, 3}_2 ∨ -b^{159, 3}_1 ∨ -b^{159, 3}_0 ∨ false 
c  in DIMACS:
-21083 -21084 -21085  0

c i = 4
c  -2+1 --> -1
c    ( b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧  p_636) -> ( b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0)
c  in CNF:
c    -b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨  b^{159, 5}_2
c    -b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_1
c    -b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨  b^{159, 5}_0
c  in DIMACS:
-21086 -21087  21088 -636  21089 0
-21086 -21087  21088 -636 -21090 0
-21086 -21087  21088 -636  21091 0

c  -1+1 --> 0
c    ( b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0 ∧  p_636) -> (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧ -b^{159, 5}_0)
c  in CNF:
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_2
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_1
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_0
c  in DIMACS:
-21086  21087 -21088 -636 -21089 0
-21086  21087 -21088 -636 -21090 0
-21086  21087 -21088 -636 -21091 0

c  0+1 --> 1
c    (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧  p_636) -> (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0)
c  in CNF:
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_2
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_1
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨  b^{159, 5}_0
c  in DIMACS:
 21086  21087  21088 -636 -21089 0
 21086  21087  21088 -636 -21090 0
 21086  21087  21088 -636  21091 0

c  1+1 --> 2
c    (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0 ∧  p_636) -> (-b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0)
c  in CNF:
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_2
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨  b^{159, 5}_1
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ -p_636 ∨ -b^{159, 5}_0
c  in DIMACS:
 21086  21087 -21088 -636 -21089 0
 21086  21087 -21088 -636  21090 0
 21086  21087 -21088 -636 -21091 0

c  2+1 --> break 
c    (-b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧  p_636) -> break
c  in CNF:
c     b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 21086 -21087  21088 -636 1162 0


c  2-1 --> 1
c    (-b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧ -p_636) -> (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0)
c  in CNF:
c     b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_2
c     b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_1
c     b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨  b^{159, 5}_0
c  in DIMACS:
 21086 -21087  21088  636 -21089 0
 21086 -21087  21088  636 -21090 0
 21086 -21087  21088  636  21091 0

c  1-1 --> 0
c    (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0 ∧ -p_636) -> (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧ -b^{159, 5}_0)
c  in CNF:
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_2
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_1
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_0
c  in DIMACS:
 21086  21087 -21088  636 -21089 0
 21086  21087 -21088  636 -21090 0
 21086  21087 -21088  636 -21091 0

c  0-1 --> -1
c    (-b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧ -p_636) -> ( b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0)
c  in CNF:
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨  b^{159, 5}_2
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_1
c     b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨  b^{159, 5}_0
c  in DIMACS:
 21086  21087  21088  636  21089 0
 21086  21087  21088  636 -21090 0
 21086  21087  21088  636  21091 0

c  -1-1 --> -2
c    ( b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧  b^{159, 4}_0 ∧ -p_636) -> ( b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0)
c  in CNF:
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨  b^{159, 5}_2
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨  b^{159, 5}_1
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨  p_636 ∨ -b^{159, 5}_0
c  in DIMACS:
-21086  21087 -21088  636  21089 0
-21086  21087 -21088  636  21090 0
-21086  21087 -21088  636 -21091 0

c  -2-1 --> break 
c    ( b^{159, 4}_2 ∧  b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨  b^{159, 4}_0 ∨  p_636 ∨ break
c  in DIMACS:
-21086 -21087  21088  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 4}_2 ∧ -b^{159, 4}_1 ∧ -b^{159, 4}_0 ∧ true) 
c  in CNF:
c    -b^{159, 4}_2 ∨  b^{159, 4}_1 ∨  b^{159, 4}_0 ∨ false 
c  in DIMACS:
-21086  21087  21088  0

c  3 does not represent an automaton state.
c    -(-b^{159, 4}_2 ∧  b^{159, 4}_1 ∧  b^{159, 4}_0 ∧ true) 
c  in CNF:
c     b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ false 
c  in DIMACS:
 21086 -21087 -21088  0
c  -3 does not represent an automaton state.
c    -( b^{159, 4}_2 ∧  b^{159, 4}_1 ∧  b^{159, 4}_0 ∧ true) 
c  in CNF:
c    -b^{159, 4}_2 ∨ -b^{159, 4}_1 ∨ -b^{159, 4}_0 ∨ false 
c  in DIMACS:
-21086 -21087 -21088  0

c i = 5
c  -2+1 --> -1
c    ( b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧  p_795) -> ( b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0)
c  in CNF:
c    -b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨  b^{159, 6}_2
c    -b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_1
c    -b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨  b^{159, 6}_0
c  in DIMACS:
-21089 -21090  21091 -795  21092 0
-21089 -21090  21091 -795 -21093 0
-21089 -21090  21091 -795  21094 0

c  -1+1 --> 0
c    ( b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0 ∧  p_795) -> (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧ -b^{159, 6}_0)
c  in CNF:
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_2
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_1
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_0
c  in DIMACS:
-21089  21090 -21091 -795 -21092 0
-21089  21090 -21091 -795 -21093 0
-21089  21090 -21091 -795 -21094 0

c  0+1 --> 1
c    (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧  p_795) -> (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0)
c  in CNF:
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_2
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_1
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨  b^{159, 6}_0
c  in DIMACS:
 21089  21090  21091 -795 -21092 0
 21089  21090  21091 -795 -21093 0
 21089  21090  21091 -795  21094 0

c  1+1 --> 2
c    (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0 ∧  p_795) -> (-b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0)
c  in CNF:
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_2
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨  b^{159, 6}_1
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ -p_795 ∨ -b^{159, 6}_0
c  in DIMACS:
 21089  21090 -21091 -795 -21092 0
 21089  21090 -21091 -795  21093 0
 21089  21090 -21091 -795 -21094 0

c  2+1 --> break 
c    (-b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧  p_795) -> break
c  in CNF:
c     b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 21089 -21090  21091 -795 1162 0


c  2-1 --> 1
c    (-b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧ -p_795) -> (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0)
c  in CNF:
c     b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_2
c     b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_1
c     b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨  b^{159, 6}_0
c  in DIMACS:
 21089 -21090  21091  795 -21092 0
 21089 -21090  21091  795 -21093 0
 21089 -21090  21091  795  21094 0

c  1-1 --> 0
c    (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0 ∧ -p_795) -> (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧ -b^{159, 6}_0)
c  in CNF:
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_2
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_1
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_0
c  in DIMACS:
 21089  21090 -21091  795 -21092 0
 21089  21090 -21091  795 -21093 0
 21089  21090 -21091  795 -21094 0

c  0-1 --> -1
c    (-b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧ -p_795) -> ( b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0)
c  in CNF:
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨  b^{159, 6}_2
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_1
c     b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨  b^{159, 6}_0
c  in DIMACS:
 21089  21090  21091  795  21092 0
 21089  21090  21091  795 -21093 0
 21089  21090  21091  795  21094 0

c  -1-1 --> -2
c    ( b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧  b^{159, 5}_0 ∧ -p_795) -> ( b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0)
c  in CNF:
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨  b^{159, 6}_2
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨  b^{159, 6}_1
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨  p_795 ∨ -b^{159, 6}_0
c  in DIMACS:
-21089  21090 -21091  795  21092 0
-21089  21090 -21091  795  21093 0
-21089  21090 -21091  795 -21094 0

c  -2-1 --> break 
c    ( b^{159, 5}_2 ∧  b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨  b^{159, 5}_0 ∨  p_795 ∨ break
c  in DIMACS:
-21089 -21090  21091  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 5}_2 ∧ -b^{159, 5}_1 ∧ -b^{159, 5}_0 ∧ true) 
c  in CNF:
c    -b^{159, 5}_2 ∨  b^{159, 5}_1 ∨  b^{159, 5}_0 ∨ false 
c  in DIMACS:
-21089  21090  21091  0

c  3 does not represent an automaton state.
c    -(-b^{159, 5}_2 ∧  b^{159, 5}_1 ∧  b^{159, 5}_0 ∧ true) 
c  in CNF:
c     b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ false 
c  in DIMACS:
 21089 -21090 -21091  0
c  -3 does not represent an automaton state.
c    -( b^{159, 5}_2 ∧  b^{159, 5}_1 ∧  b^{159, 5}_0 ∧ true) 
c  in CNF:
c    -b^{159, 5}_2 ∨ -b^{159, 5}_1 ∨ -b^{159, 5}_0 ∨ false 
c  in DIMACS:
-21089 -21090 -21091  0

c i = 6
c  -2+1 --> -1
c    ( b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧  p_954) -> ( b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0)
c  in CNF:
c    -b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨  b^{159, 7}_2
c    -b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_1
c    -b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨  b^{159, 7}_0
c  in DIMACS:
-21092 -21093  21094 -954  21095 0
-21092 -21093  21094 -954 -21096 0
-21092 -21093  21094 -954  21097 0

c  -1+1 --> 0
c    ( b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0 ∧  p_954) -> (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧ -b^{159, 7}_0)
c  in CNF:
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_2
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_1
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_0
c  in DIMACS:
-21092  21093 -21094 -954 -21095 0
-21092  21093 -21094 -954 -21096 0
-21092  21093 -21094 -954 -21097 0

c  0+1 --> 1
c    (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧  p_954) -> (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0)
c  in CNF:
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_2
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_1
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨  b^{159, 7}_0
c  in DIMACS:
 21092  21093  21094 -954 -21095 0
 21092  21093  21094 -954 -21096 0
 21092  21093  21094 -954  21097 0

c  1+1 --> 2
c    (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0 ∧  p_954) -> (-b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0)
c  in CNF:
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_2
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨  b^{159, 7}_1
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ -p_954 ∨ -b^{159, 7}_0
c  in DIMACS:
 21092  21093 -21094 -954 -21095 0
 21092  21093 -21094 -954  21096 0
 21092  21093 -21094 -954 -21097 0

c  2+1 --> break 
c    (-b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧  p_954) -> break
c  in CNF:
c     b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 21092 -21093  21094 -954 1162 0


c  2-1 --> 1
c    (-b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧ -p_954) -> (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0)
c  in CNF:
c     b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_2
c     b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_1
c     b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨  b^{159, 7}_0
c  in DIMACS:
 21092 -21093  21094  954 -21095 0
 21092 -21093  21094  954 -21096 0
 21092 -21093  21094  954  21097 0

c  1-1 --> 0
c    (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0 ∧ -p_954) -> (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧ -b^{159, 7}_0)
c  in CNF:
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_2
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_1
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_0
c  in DIMACS:
 21092  21093 -21094  954 -21095 0
 21092  21093 -21094  954 -21096 0
 21092  21093 -21094  954 -21097 0

c  0-1 --> -1
c    (-b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧ -p_954) -> ( b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0)
c  in CNF:
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨  b^{159, 7}_2
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_1
c     b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨  b^{159, 7}_0
c  in DIMACS:
 21092  21093  21094  954  21095 0
 21092  21093  21094  954 -21096 0
 21092  21093  21094  954  21097 0

c  -1-1 --> -2
c    ( b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧  b^{159, 6}_0 ∧ -p_954) -> ( b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0)
c  in CNF:
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨  b^{159, 7}_2
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨  b^{159, 7}_1
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨  p_954 ∨ -b^{159, 7}_0
c  in DIMACS:
-21092  21093 -21094  954  21095 0
-21092  21093 -21094  954  21096 0
-21092  21093 -21094  954 -21097 0

c  -2-1 --> break 
c    ( b^{159, 6}_2 ∧  b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨  b^{159, 6}_0 ∨  p_954 ∨ break
c  in DIMACS:
-21092 -21093  21094  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 6}_2 ∧ -b^{159, 6}_1 ∧ -b^{159, 6}_0 ∧ true) 
c  in CNF:
c    -b^{159, 6}_2 ∨  b^{159, 6}_1 ∨  b^{159, 6}_0 ∨ false 
c  in DIMACS:
-21092  21093  21094  0

c  3 does not represent an automaton state.
c    -(-b^{159, 6}_2 ∧  b^{159, 6}_1 ∧  b^{159, 6}_0 ∧ true) 
c  in CNF:
c     b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ false 
c  in DIMACS:
 21092 -21093 -21094  0
c  -3 does not represent an automaton state.
c    -( b^{159, 6}_2 ∧  b^{159, 6}_1 ∧  b^{159, 6}_0 ∧ true) 
c  in CNF:
c    -b^{159, 6}_2 ∨ -b^{159, 6}_1 ∨ -b^{159, 6}_0 ∨ false 
c  in DIMACS:
-21092 -21093 -21094  0

c i = 7
c  -2+1 --> -1
c    ( b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧  p_1113) -> ( b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧  b^{159, 8}_0)
c  in CNF:
c    -b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨  b^{159, 8}_2
c    -b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_1
c    -b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨  b^{159, 8}_0
c  in DIMACS:
-21095 -21096  21097 -1113  21098 0
-21095 -21096  21097 -1113 -21099 0
-21095 -21096  21097 -1113  21100 0

c  -1+1 --> 0
c    ( b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0 ∧  p_1113) -> (-b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧ -b^{159, 8}_0)
c  in CNF:
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_2
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_1
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_0
c  in DIMACS:
-21095  21096 -21097 -1113 -21098 0
-21095  21096 -21097 -1113 -21099 0
-21095  21096 -21097 -1113 -21100 0

c  0+1 --> 1
c    (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧  p_1113) -> (-b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧  b^{159, 8}_0)
c  in CNF:
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_2
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_1
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨  b^{159, 8}_0
c  in DIMACS:
 21095  21096  21097 -1113 -21098 0
 21095  21096  21097 -1113 -21099 0
 21095  21096  21097 -1113  21100 0

c  1+1 --> 2
c    (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0 ∧  p_1113) -> (-b^{159, 8}_2 ∧  b^{159, 8}_1 ∧ -b^{159, 8}_0)
c  in CNF:
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_2
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨  b^{159, 8}_1
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ -p_1113 ∨ -b^{159, 8}_0
c  in DIMACS:
 21095  21096 -21097 -1113 -21098 0
 21095  21096 -21097 -1113  21099 0
 21095  21096 -21097 -1113 -21100 0

c  2+1 --> break 
c    (-b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 21095 -21096  21097 -1113 1162 0


c  2-1 --> 1
c    (-b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧ -p_1113) -> (-b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧  b^{159, 8}_0)
c  in CNF:
c     b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_2
c     b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_1
c     b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨  b^{159, 8}_0
c  in DIMACS:
 21095 -21096  21097  1113 -21098 0
 21095 -21096  21097  1113 -21099 0
 21095 -21096  21097  1113  21100 0

c  1-1 --> 0
c    (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0 ∧ -p_1113) -> (-b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧ -b^{159, 8}_0)
c  in CNF:
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_2
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_1
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_0
c  in DIMACS:
 21095  21096 -21097  1113 -21098 0
 21095  21096 -21097  1113 -21099 0
 21095  21096 -21097  1113 -21100 0

c  0-1 --> -1
c    (-b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧ -p_1113) -> ( b^{159, 8}_2 ∧ -b^{159, 8}_1 ∧  b^{159, 8}_0)
c  in CNF:
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨  b^{159, 8}_2
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_1
c     b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨  b^{159, 8}_0
c  in DIMACS:
 21095  21096  21097  1113  21098 0
 21095  21096  21097  1113 -21099 0
 21095  21096  21097  1113  21100 0

c  -1-1 --> -2
c    ( b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧  b^{159, 7}_0 ∧ -p_1113) -> ( b^{159, 8}_2 ∧  b^{159, 8}_1 ∧ -b^{159, 8}_0)
c  in CNF:
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨  b^{159, 8}_2
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨  b^{159, 8}_1
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨  p_1113 ∨ -b^{159, 8}_0
c  in DIMACS:
-21095  21096 -21097  1113  21098 0
-21095  21096 -21097  1113  21099 0
-21095  21096 -21097  1113 -21100 0

c  -2-1 --> break 
c    ( b^{159, 7}_2 ∧  b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨  b^{159, 7}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-21095 -21096  21097  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{159, 7}_2 ∧ -b^{159, 7}_1 ∧ -b^{159, 7}_0 ∧ true) 
c  in CNF:
c    -b^{159, 7}_2 ∨  b^{159, 7}_1 ∨  b^{159, 7}_0 ∨ false 
c  in DIMACS:
-21095  21096  21097  0

c  3 does not represent an automaton state.
c    -(-b^{159, 7}_2 ∧  b^{159, 7}_1 ∧  b^{159, 7}_0 ∧ true) 
c  in CNF:
c     b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ false 
c  in DIMACS:
 21095 -21096 -21097  0
c  -3 does not represent an automaton state.
c    -( b^{159, 7}_2 ∧  b^{159, 7}_1 ∧  b^{159, 7}_0 ∧ true) 
c  in CNF:
c    -b^{159, 7}_2 ∨ -b^{159, 7}_1 ∨ -b^{159, 7}_0 ∨ false 
c  in DIMACS:
-21095 -21096 -21097  0

c INIT for k = 160
c    -b^{160, 1}_2
c    -b^{160, 1}_1
c    -b^{160, 1}_0
c  in DIMACS:
-21101 0
-21102 0
-21103 0

c Transitions for k = 160
c i = 1
c  -2+1 --> -1
c    ( b^{160, 1}_2 ∧  b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧  p_160) -> ( b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0)
c  in CNF:
c    -b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨  b^{160, 2}_2
c    -b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_1
c    -b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨  b^{160, 2}_0
c  in DIMACS:
-21101 -21102  21103 -160  21104 0
-21101 -21102  21103 -160 -21105 0
-21101 -21102  21103 -160  21106 0

c  -1+1 --> 0
c    ( b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧  b^{160, 1}_0 ∧  p_160) -> (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧ -b^{160, 2}_0)
c  in CNF:
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_2
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_1
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_0
c  in DIMACS:
-21101  21102 -21103 -160 -21104 0
-21101  21102 -21103 -160 -21105 0
-21101  21102 -21103 -160 -21106 0

c  0+1 --> 1
c    (-b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧  p_160) -> (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0)
c  in CNF:
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_2
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_1
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨  b^{160, 2}_0
c  in DIMACS:
 21101  21102  21103 -160 -21104 0
 21101  21102  21103 -160 -21105 0
 21101  21102  21103 -160  21106 0

c  1+1 --> 2
c    (-b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧  b^{160, 1}_0 ∧  p_160) -> (-b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0)
c  in CNF:
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_2
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨  b^{160, 2}_1
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ -p_160 ∨ -b^{160, 2}_0
c  in DIMACS:
 21101  21102 -21103 -160 -21104 0
 21101  21102 -21103 -160  21105 0
 21101  21102 -21103 -160 -21106 0

c  2+1 --> break 
c    (-b^{160, 1}_2 ∧  b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧  p_160) -> break
c  in CNF:
c     b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ -p_160 ∨ break
c  in DIMACS:
 21101 -21102  21103 -160 1162 0


c  2-1 --> 1
c    (-b^{160, 1}_2 ∧  b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧ -p_160) -> (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0)
c  in CNF:
c     b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_2
c     b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_1
c     b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨  b^{160, 2}_0
c  in DIMACS:
 21101 -21102  21103  160 -21104 0
 21101 -21102  21103  160 -21105 0
 21101 -21102  21103  160  21106 0

c  1-1 --> 0
c    (-b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧  b^{160, 1}_0 ∧ -p_160) -> (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧ -b^{160, 2}_0)
c  in CNF:
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_2
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_1
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_0
c  in DIMACS:
 21101  21102 -21103  160 -21104 0
 21101  21102 -21103  160 -21105 0
 21101  21102 -21103  160 -21106 0

c  0-1 --> -1
c    (-b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧ -p_160) -> ( b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0)
c  in CNF:
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨  b^{160, 2}_2
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_1
c     b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨  b^{160, 2}_0
c  in DIMACS:
 21101  21102  21103  160  21104 0
 21101  21102  21103  160 -21105 0
 21101  21102  21103  160  21106 0

c  -1-1 --> -2
c    ( b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧  b^{160, 1}_0 ∧ -p_160) -> ( b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0)
c  in CNF:
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨  b^{160, 2}_2
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨  b^{160, 2}_1
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨  p_160 ∨ -b^{160, 2}_0
c  in DIMACS:
-21101  21102 -21103  160  21104 0
-21101  21102 -21103  160  21105 0
-21101  21102 -21103  160 -21106 0

c  -2-1 --> break 
c    ( b^{160, 1}_2 ∧  b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧ -p_160) -> break
c  in CNF:
c    -b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨  b^{160, 1}_0 ∨  p_160 ∨ break
c  in DIMACS:
-21101 -21102  21103  160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 1}_2 ∧ -b^{160, 1}_1 ∧ -b^{160, 1}_0 ∧ true) 
c  in CNF:
c    -b^{160, 1}_2 ∨  b^{160, 1}_1 ∨  b^{160, 1}_0 ∨ false 
c  in DIMACS:
-21101  21102  21103  0

c  3 does not represent an automaton state.
c    -(-b^{160, 1}_2 ∧  b^{160, 1}_1 ∧  b^{160, 1}_0 ∧ true) 
c  in CNF:
c     b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ false 
c  in DIMACS:
 21101 -21102 -21103  0
c  -3 does not represent an automaton state.
c    -( b^{160, 1}_2 ∧  b^{160, 1}_1 ∧  b^{160, 1}_0 ∧ true) 
c  in CNF:
c    -b^{160, 1}_2 ∨ -b^{160, 1}_1 ∨ -b^{160, 1}_0 ∨ false 
c  in DIMACS:
-21101 -21102 -21103  0

c i = 2
c  -2+1 --> -1
c    ( b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧  p_320) -> ( b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0)
c  in CNF:
c    -b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨  b^{160, 3}_2
c    -b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_1
c    -b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨  b^{160, 3}_0
c  in DIMACS:
-21104 -21105  21106 -320  21107 0
-21104 -21105  21106 -320 -21108 0
-21104 -21105  21106 -320  21109 0

c  -1+1 --> 0
c    ( b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0 ∧  p_320) -> (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧ -b^{160, 3}_0)
c  in CNF:
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_2
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_1
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_0
c  in DIMACS:
-21104  21105 -21106 -320 -21107 0
-21104  21105 -21106 -320 -21108 0
-21104  21105 -21106 -320 -21109 0

c  0+1 --> 1
c    (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧  p_320) -> (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0)
c  in CNF:
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_2
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_1
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨  b^{160, 3}_0
c  in DIMACS:
 21104  21105  21106 -320 -21107 0
 21104  21105  21106 -320 -21108 0
 21104  21105  21106 -320  21109 0

c  1+1 --> 2
c    (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0 ∧  p_320) -> (-b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0)
c  in CNF:
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_2
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨  b^{160, 3}_1
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ -p_320 ∨ -b^{160, 3}_0
c  in DIMACS:
 21104  21105 -21106 -320 -21107 0
 21104  21105 -21106 -320  21108 0
 21104  21105 -21106 -320 -21109 0

c  2+1 --> break 
c    (-b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧  p_320) -> break
c  in CNF:
c     b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 21104 -21105  21106 -320 1162 0


c  2-1 --> 1
c    (-b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧ -p_320) -> (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0)
c  in CNF:
c     b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_2
c     b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_1
c     b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨  b^{160, 3}_0
c  in DIMACS:
 21104 -21105  21106  320 -21107 0
 21104 -21105  21106  320 -21108 0
 21104 -21105  21106  320  21109 0

c  1-1 --> 0
c    (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0 ∧ -p_320) -> (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧ -b^{160, 3}_0)
c  in CNF:
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_2
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_1
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_0
c  in DIMACS:
 21104  21105 -21106  320 -21107 0
 21104  21105 -21106  320 -21108 0
 21104  21105 -21106  320 -21109 0

c  0-1 --> -1
c    (-b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧ -p_320) -> ( b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0)
c  in CNF:
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨  b^{160, 3}_2
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_1
c     b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨  b^{160, 3}_0
c  in DIMACS:
 21104  21105  21106  320  21107 0
 21104  21105  21106  320 -21108 0
 21104  21105  21106  320  21109 0

c  -1-1 --> -2
c    ( b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧  b^{160, 2}_0 ∧ -p_320) -> ( b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0)
c  in CNF:
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨  b^{160, 3}_2
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨  b^{160, 3}_1
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨  p_320 ∨ -b^{160, 3}_0
c  in DIMACS:
-21104  21105 -21106  320  21107 0
-21104  21105 -21106  320  21108 0
-21104  21105 -21106  320 -21109 0

c  -2-1 --> break 
c    ( b^{160, 2}_2 ∧  b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨  b^{160, 2}_0 ∨  p_320 ∨ break
c  in DIMACS:
-21104 -21105  21106  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 2}_2 ∧ -b^{160, 2}_1 ∧ -b^{160, 2}_0 ∧ true) 
c  in CNF:
c    -b^{160, 2}_2 ∨  b^{160, 2}_1 ∨  b^{160, 2}_0 ∨ false 
c  in DIMACS:
-21104  21105  21106  0

c  3 does not represent an automaton state.
c    -(-b^{160, 2}_2 ∧  b^{160, 2}_1 ∧  b^{160, 2}_0 ∧ true) 
c  in CNF:
c     b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ false 
c  in DIMACS:
 21104 -21105 -21106  0
c  -3 does not represent an automaton state.
c    -( b^{160, 2}_2 ∧  b^{160, 2}_1 ∧  b^{160, 2}_0 ∧ true) 
c  in CNF:
c    -b^{160, 2}_2 ∨ -b^{160, 2}_1 ∨ -b^{160, 2}_0 ∨ false 
c  in DIMACS:
-21104 -21105 -21106  0

c i = 3
c  -2+1 --> -1
c    ( b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧  p_480) -> ( b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0)
c  in CNF:
c    -b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨  b^{160, 4}_2
c    -b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_1
c    -b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨  b^{160, 4}_0
c  in DIMACS:
-21107 -21108  21109 -480  21110 0
-21107 -21108  21109 -480 -21111 0
-21107 -21108  21109 -480  21112 0

c  -1+1 --> 0
c    ( b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0 ∧  p_480) -> (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧ -b^{160, 4}_0)
c  in CNF:
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_2
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_1
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_0
c  in DIMACS:
-21107  21108 -21109 -480 -21110 0
-21107  21108 -21109 -480 -21111 0
-21107  21108 -21109 -480 -21112 0

c  0+1 --> 1
c    (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧  p_480) -> (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0)
c  in CNF:
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_2
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_1
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨  b^{160, 4}_0
c  in DIMACS:
 21107  21108  21109 -480 -21110 0
 21107  21108  21109 -480 -21111 0
 21107  21108  21109 -480  21112 0

c  1+1 --> 2
c    (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0 ∧  p_480) -> (-b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0)
c  in CNF:
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_2
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨  b^{160, 4}_1
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ -p_480 ∨ -b^{160, 4}_0
c  in DIMACS:
 21107  21108 -21109 -480 -21110 0
 21107  21108 -21109 -480  21111 0
 21107  21108 -21109 -480 -21112 0

c  2+1 --> break 
c    (-b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧  p_480) -> break
c  in CNF:
c     b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 21107 -21108  21109 -480 1162 0


c  2-1 --> 1
c    (-b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧ -p_480) -> (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0)
c  in CNF:
c     b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_2
c     b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_1
c     b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨  b^{160, 4}_0
c  in DIMACS:
 21107 -21108  21109  480 -21110 0
 21107 -21108  21109  480 -21111 0
 21107 -21108  21109  480  21112 0

c  1-1 --> 0
c    (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0 ∧ -p_480) -> (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧ -b^{160, 4}_0)
c  in CNF:
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_2
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_1
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_0
c  in DIMACS:
 21107  21108 -21109  480 -21110 0
 21107  21108 -21109  480 -21111 0
 21107  21108 -21109  480 -21112 0

c  0-1 --> -1
c    (-b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧ -p_480) -> ( b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0)
c  in CNF:
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨  b^{160, 4}_2
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_1
c     b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨  b^{160, 4}_0
c  in DIMACS:
 21107  21108  21109  480  21110 0
 21107  21108  21109  480 -21111 0
 21107  21108  21109  480  21112 0

c  -1-1 --> -2
c    ( b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧  b^{160, 3}_0 ∧ -p_480) -> ( b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0)
c  in CNF:
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨  b^{160, 4}_2
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨  b^{160, 4}_1
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨  p_480 ∨ -b^{160, 4}_0
c  in DIMACS:
-21107  21108 -21109  480  21110 0
-21107  21108 -21109  480  21111 0
-21107  21108 -21109  480 -21112 0

c  -2-1 --> break 
c    ( b^{160, 3}_2 ∧  b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨  b^{160, 3}_0 ∨  p_480 ∨ break
c  in DIMACS:
-21107 -21108  21109  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 3}_2 ∧ -b^{160, 3}_1 ∧ -b^{160, 3}_0 ∧ true) 
c  in CNF:
c    -b^{160, 3}_2 ∨  b^{160, 3}_1 ∨  b^{160, 3}_0 ∨ false 
c  in DIMACS:
-21107  21108  21109  0

c  3 does not represent an automaton state.
c    -(-b^{160, 3}_2 ∧  b^{160, 3}_1 ∧  b^{160, 3}_0 ∧ true) 
c  in CNF:
c     b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ false 
c  in DIMACS:
 21107 -21108 -21109  0
c  -3 does not represent an automaton state.
c    -( b^{160, 3}_2 ∧  b^{160, 3}_1 ∧  b^{160, 3}_0 ∧ true) 
c  in CNF:
c    -b^{160, 3}_2 ∨ -b^{160, 3}_1 ∨ -b^{160, 3}_0 ∨ false 
c  in DIMACS:
-21107 -21108 -21109  0

c i = 4
c  -2+1 --> -1
c    ( b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧  p_640) -> ( b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0)
c  in CNF:
c    -b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨  b^{160, 5}_2
c    -b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_1
c    -b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨  b^{160, 5}_0
c  in DIMACS:
-21110 -21111  21112 -640  21113 0
-21110 -21111  21112 -640 -21114 0
-21110 -21111  21112 -640  21115 0

c  -1+1 --> 0
c    ( b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0 ∧  p_640) -> (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧ -b^{160, 5}_0)
c  in CNF:
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_2
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_1
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_0
c  in DIMACS:
-21110  21111 -21112 -640 -21113 0
-21110  21111 -21112 -640 -21114 0
-21110  21111 -21112 -640 -21115 0

c  0+1 --> 1
c    (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧  p_640) -> (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0)
c  in CNF:
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_2
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_1
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨  b^{160, 5}_0
c  in DIMACS:
 21110  21111  21112 -640 -21113 0
 21110  21111  21112 -640 -21114 0
 21110  21111  21112 -640  21115 0

c  1+1 --> 2
c    (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0 ∧  p_640) -> (-b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0)
c  in CNF:
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_2
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨  b^{160, 5}_1
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ -p_640 ∨ -b^{160, 5}_0
c  in DIMACS:
 21110  21111 -21112 -640 -21113 0
 21110  21111 -21112 -640  21114 0
 21110  21111 -21112 -640 -21115 0

c  2+1 --> break 
c    (-b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧  p_640) -> break
c  in CNF:
c     b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 21110 -21111  21112 -640 1162 0


c  2-1 --> 1
c    (-b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧ -p_640) -> (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0)
c  in CNF:
c     b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_2
c     b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_1
c     b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨  b^{160, 5}_0
c  in DIMACS:
 21110 -21111  21112  640 -21113 0
 21110 -21111  21112  640 -21114 0
 21110 -21111  21112  640  21115 0

c  1-1 --> 0
c    (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0 ∧ -p_640) -> (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧ -b^{160, 5}_0)
c  in CNF:
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_2
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_1
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_0
c  in DIMACS:
 21110  21111 -21112  640 -21113 0
 21110  21111 -21112  640 -21114 0
 21110  21111 -21112  640 -21115 0

c  0-1 --> -1
c    (-b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧ -p_640) -> ( b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0)
c  in CNF:
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨  b^{160, 5}_2
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_1
c     b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨  b^{160, 5}_0
c  in DIMACS:
 21110  21111  21112  640  21113 0
 21110  21111  21112  640 -21114 0
 21110  21111  21112  640  21115 0

c  -1-1 --> -2
c    ( b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧  b^{160, 4}_0 ∧ -p_640) -> ( b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0)
c  in CNF:
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨  b^{160, 5}_2
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨  b^{160, 5}_1
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨  p_640 ∨ -b^{160, 5}_0
c  in DIMACS:
-21110  21111 -21112  640  21113 0
-21110  21111 -21112  640  21114 0
-21110  21111 -21112  640 -21115 0

c  -2-1 --> break 
c    ( b^{160, 4}_2 ∧  b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨  b^{160, 4}_0 ∨  p_640 ∨ break
c  in DIMACS:
-21110 -21111  21112  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 4}_2 ∧ -b^{160, 4}_1 ∧ -b^{160, 4}_0 ∧ true) 
c  in CNF:
c    -b^{160, 4}_2 ∨  b^{160, 4}_1 ∨  b^{160, 4}_0 ∨ false 
c  in DIMACS:
-21110  21111  21112  0

c  3 does not represent an automaton state.
c    -(-b^{160, 4}_2 ∧  b^{160, 4}_1 ∧  b^{160, 4}_0 ∧ true) 
c  in CNF:
c     b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ false 
c  in DIMACS:
 21110 -21111 -21112  0
c  -3 does not represent an automaton state.
c    -( b^{160, 4}_2 ∧  b^{160, 4}_1 ∧  b^{160, 4}_0 ∧ true) 
c  in CNF:
c    -b^{160, 4}_2 ∨ -b^{160, 4}_1 ∨ -b^{160, 4}_0 ∨ false 
c  in DIMACS:
-21110 -21111 -21112  0

c i = 5
c  -2+1 --> -1
c    ( b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧  p_800) -> ( b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0)
c  in CNF:
c    -b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨  b^{160, 6}_2
c    -b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_1
c    -b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨  b^{160, 6}_0
c  in DIMACS:
-21113 -21114  21115 -800  21116 0
-21113 -21114  21115 -800 -21117 0
-21113 -21114  21115 -800  21118 0

c  -1+1 --> 0
c    ( b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0 ∧  p_800) -> (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧ -b^{160, 6}_0)
c  in CNF:
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_2
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_1
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_0
c  in DIMACS:
-21113  21114 -21115 -800 -21116 0
-21113  21114 -21115 -800 -21117 0
-21113  21114 -21115 -800 -21118 0

c  0+1 --> 1
c    (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧  p_800) -> (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0)
c  in CNF:
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_2
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_1
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨  b^{160, 6}_0
c  in DIMACS:
 21113  21114  21115 -800 -21116 0
 21113  21114  21115 -800 -21117 0
 21113  21114  21115 -800  21118 0

c  1+1 --> 2
c    (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0 ∧  p_800) -> (-b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0)
c  in CNF:
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_2
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨  b^{160, 6}_1
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ -p_800 ∨ -b^{160, 6}_0
c  in DIMACS:
 21113  21114 -21115 -800 -21116 0
 21113  21114 -21115 -800  21117 0
 21113  21114 -21115 -800 -21118 0

c  2+1 --> break 
c    (-b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧  p_800) -> break
c  in CNF:
c     b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 21113 -21114  21115 -800 1162 0


c  2-1 --> 1
c    (-b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧ -p_800) -> (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0)
c  in CNF:
c     b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_2
c     b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_1
c     b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨  b^{160, 6}_0
c  in DIMACS:
 21113 -21114  21115  800 -21116 0
 21113 -21114  21115  800 -21117 0
 21113 -21114  21115  800  21118 0

c  1-1 --> 0
c    (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0 ∧ -p_800) -> (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧ -b^{160, 6}_0)
c  in CNF:
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_2
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_1
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_0
c  in DIMACS:
 21113  21114 -21115  800 -21116 0
 21113  21114 -21115  800 -21117 0
 21113  21114 -21115  800 -21118 0

c  0-1 --> -1
c    (-b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧ -p_800) -> ( b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0)
c  in CNF:
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨  b^{160, 6}_2
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_1
c     b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨  b^{160, 6}_0
c  in DIMACS:
 21113  21114  21115  800  21116 0
 21113  21114  21115  800 -21117 0
 21113  21114  21115  800  21118 0

c  -1-1 --> -2
c    ( b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧  b^{160, 5}_0 ∧ -p_800) -> ( b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0)
c  in CNF:
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨  b^{160, 6}_2
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨  b^{160, 6}_1
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨  p_800 ∨ -b^{160, 6}_0
c  in DIMACS:
-21113  21114 -21115  800  21116 0
-21113  21114 -21115  800  21117 0
-21113  21114 -21115  800 -21118 0

c  -2-1 --> break 
c    ( b^{160, 5}_2 ∧  b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨  b^{160, 5}_0 ∨  p_800 ∨ break
c  in DIMACS:
-21113 -21114  21115  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 5}_2 ∧ -b^{160, 5}_1 ∧ -b^{160, 5}_0 ∧ true) 
c  in CNF:
c    -b^{160, 5}_2 ∨  b^{160, 5}_1 ∨  b^{160, 5}_0 ∨ false 
c  in DIMACS:
-21113  21114  21115  0

c  3 does not represent an automaton state.
c    -(-b^{160, 5}_2 ∧  b^{160, 5}_1 ∧  b^{160, 5}_0 ∧ true) 
c  in CNF:
c     b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ false 
c  in DIMACS:
 21113 -21114 -21115  0
c  -3 does not represent an automaton state.
c    -( b^{160, 5}_2 ∧  b^{160, 5}_1 ∧  b^{160, 5}_0 ∧ true) 
c  in CNF:
c    -b^{160, 5}_2 ∨ -b^{160, 5}_1 ∨ -b^{160, 5}_0 ∨ false 
c  in DIMACS:
-21113 -21114 -21115  0

c i = 6
c  -2+1 --> -1
c    ( b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧  p_960) -> ( b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0)
c  in CNF:
c    -b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨  b^{160, 7}_2
c    -b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_1
c    -b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨  b^{160, 7}_0
c  in DIMACS:
-21116 -21117  21118 -960  21119 0
-21116 -21117  21118 -960 -21120 0
-21116 -21117  21118 -960  21121 0

c  -1+1 --> 0
c    ( b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0 ∧  p_960) -> (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧ -b^{160, 7}_0)
c  in CNF:
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_2
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_1
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_0
c  in DIMACS:
-21116  21117 -21118 -960 -21119 0
-21116  21117 -21118 -960 -21120 0
-21116  21117 -21118 -960 -21121 0

c  0+1 --> 1
c    (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧  p_960) -> (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0)
c  in CNF:
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_2
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_1
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨  b^{160, 7}_0
c  in DIMACS:
 21116  21117  21118 -960 -21119 0
 21116  21117  21118 -960 -21120 0
 21116  21117  21118 -960  21121 0

c  1+1 --> 2
c    (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0 ∧  p_960) -> (-b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0)
c  in CNF:
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_2
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨  b^{160, 7}_1
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ -p_960 ∨ -b^{160, 7}_0
c  in DIMACS:
 21116  21117 -21118 -960 -21119 0
 21116  21117 -21118 -960  21120 0
 21116  21117 -21118 -960 -21121 0

c  2+1 --> break 
c    (-b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧  p_960) -> break
c  in CNF:
c     b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 21116 -21117  21118 -960 1162 0


c  2-1 --> 1
c    (-b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧ -p_960) -> (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0)
c  in CNF:
c     b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_2
c     b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_1
c     b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨  b^{160, 7}_0
c  in DIMACS:
 21116 -21117  21118  960 -21119 0
 21116 -21117  21118  960 -21120 0
 21116 -21117  21118  960  21121 0

c  1-1 --> 0
c    (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0 ∧ -p_960) -> (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧ -b^{160, 7}_0)
c  in CNF:
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_2
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_1
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_0
c  in DIMACS:
 21116  21117 -21118  960 -21119 0
 21116  21117 -21118  960 -21120 0
 21116  21117 -21118  960 -21121 0

c  0-1 --> -1
c    (-b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧ -p_960) -> ( b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0)
c  in CNF:
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨  b^{160, 7}_2
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_1
c     b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨  b^{160, 7}_0
c  in DIMACS:
 21116  21117  21118  960  21119 0
 21116  21117  21118  960 -21120 0
 21116  21117  21118  960  21121 0

c  -1-1 --> -2
c    ( b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧  b^{160, 6}_0 ∧ -p_960) -> ( b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0)
c  in CNF:
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨  b^{160, 7}_2
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨  b^{160, 7}_1
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨  p_960 ∨ -b^{160, 7}_0
c  in DIMACS:
-21116  21117 -21118  960  21119 0
-21116  21117 -21118  960  21120 0
-21116  21117 -21118  960 -21121 0

c  -2-1 --> break 
c    ( b^{160, 6}_2 ∧  b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨  b^{160, 6}_0 ∨  p_960 ∨ break
c  in DIMACS:
-21116 -21117  21118  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 6}_2 ∧ -b^{160, 6}_1 ∧ -b^{160, 6}_0 ∧ true) 
c  in CNF:
c    -b^{160, 6}_2 ∨  b^{160, 6}_1 ∨  b^{160, 6}_0 ∨ false 
c  in DIMACS:
-21116  21117  21118  0

c  3 does not represent an automaton state.
c    -(-b^{160, 6}_2 ∧  b^{160, 6}_1 ∧  b^{160, 6}_0 ∧ true) 
c  in CNF:
c     b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ false 
c  in DIMACS:
 21116 -21117 -21118  0
c  -3 does not represent an automaton state.
c    -( b^{160, 6}_2 ∧  b^{160, 6}_1 ∧  b^{160, 6}_0 ∧ true) 
c  in CNF:
c    -b^{160, 6}_2 ∨ -b^{160, 6}_1 ∨ -b^{160, 6}_0 ∨ false 
c  in DIMACS:
-21116 -21117 -21118  0

c i = 7
c  -2+1 --> -1
c    ( b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧  p_1120) -> ( b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧  b^{160, 8}_0)
c  in CNF:
c    -b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨  b^{160, 8}_2
c    -b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_1
c    -b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨  b^{160, 8}_0
c  in DIMACS:
-21119 -21120  21121 -1120  21122 0
-21119 -21120  21121 -1120 -21123 0
-21119 -21120  21121 -1120  21124 0

c  -1+1 --> 0
c    ( b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0 ∧  p_1120) -> (-b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧ -b^{160, 8}_0)
c  in CNF:
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_2
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_1
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_0
c  in DIMACS:
-21119  21120 -21121 -1120 -21122 0
-21119  21120 -21121 -1120 -21123 0
-21119  21120 -21121 -1120 -21124 0

c  0+1 --> 1
c    (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧  p_1120) -> (-b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧  b^{160, 8}_0)
c  in CNF:
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_2
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_1
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨  b^{160, 8}_0
c  in DIMACS:
 21119  21120  21121 -1120 -21122 0
 21119  21120  21121 -1120 -21123 0
 21119  21120  21121 -1120  21124 0

c  1+1 --> 2
c    (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0 ∧  p_1120) -> (-b^{160, 8}_2 ∧  b^{160, 8}_1 ∧ -b^{160, 8}_0)
c  in CNF:
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_2
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨  b^{160, 8}_1
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ -p_1120 ∨ -b^{160, 8}_0
c  in DIMACS:
 21119  21120 -21121 -1120 -21122 0
 21119  21120 -21121 -1120  21123 0
 21119  21120 -21121 -1120 -21124 0

c  2+1 --> break 
c    (-b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 21119 -21120  21121 -1120 1162 0


c  2-1 --> 1
c    (-b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧ -p_1120) -> (-b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧  b^{160, 8}_0)
c  in CNF:
c     b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_2
c     b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_1
c     b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨  b^{160, 8}_0
c  in DIMACS:
 21119 -21120  21121  1120 -21122 0
 21119 -21120  21121  1120 -21123 0
 21119 -21120  21121  1120  21124 0

c  1-1 --> 0
c    (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0 ∧ -p_1120) -> (-b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧ -b^{160, 8}_0)
c  in CNF:
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_2
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_1
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_0
c  in DIMACS:
 21119  21120 -21121  1120 -21122 0
 21119  21120 -21121  1120 -21123 0
 21119  21120 -21121  1120 -21124 0

c  0-1 --> -1
c    (-b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧ -p_1120) -> ( b^{160, 8}_2 ∧ -b^{160, 8}_1 ∧  b^{160, 8}_0)
c  in CNF:
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨  b^{160, 8}_2
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_1
c     b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨  b^{160, 8}_0
c  in DIMACS:
 21119  21120  21121  1120  21122 0
 21119  21120  21121  1120 -21123 0
 21119  21120  21121  1120  21124 0

c  -1-1 --> -2
c    ( b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧  b^{160, 7}_0 ∧ -p_1120) -> ( b^{160, 8}_2 ∧  b^{160, 8}_1 ∧ -b^{160, 8}_0)
c  in CNF:
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨  b^{160, 8}_2
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨  b^{160, 8}_1
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨  p_1120 ∨ -b^{160, 8}_0
c  in DIMACS:
-21119  21120 -21121  1120  21122 0
-21119  21120 -21121  1120  21123 0
-21119  21120 -21121  1120 -21124 0

c  -2-1 --> break 
c    ( b^{160, 7}_2 ∧  b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨  b^{160, 7}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-21119 -21120  21121  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{160, 7}_2 ∧ -b^{160, 7}_1 ∧ -b^{160, 7}_0 ∧ true) 
c  in CNF:
c    -b^{160, 7}_2 ∨  b^{160, 7}_1 ∨  b^{160, 7}_0 ∨ false 
c  in DIMACS:
-21119  21120  21121  0

c  3 does not represent an automaton state.
c    -(-b^{160, 7}_2 ∧  b^{160, 7}_1 ∧  b^{160, 7}_0 ∧ true) 
c  in CNF:
c     b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ false 
c  in DIMACS:
 21119 -21120 -21121  0
c  -3 does not represent an automaton state.
c    -( b^{160, 7}_2 ∧  b^{160, 7}_1 ∧  b^{160, 7}_0 ∧ true) 
c  in CNF:
c    -b^{160, 7}_2 ∨ -b^{160, 7}_1 ∨ -b^{160, 7}_0 ∨ false 
c  in DIMACS:
-21119 -21120 -21121  0

c INIT for k = 161
c    -b^{161, 1}_2
c    -b^{161, 1}_1
c    -b^{161, 1}_0
c  in DIMACS:
-21125 0
-21126 0
-21127 0

c Transitions for k = 161
c i = 1
c  -2+1 --> -1
c    ( b^{161, 1}_2 ∧  b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧  p_161) -> ( b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0)
c  in CNF:
c    -b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨  b^{161, 2}_2
c    -b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_1
c    -b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨  b^{161, 2}_0
c  in DIMACS:
-21125 -21126  21127 -161  21128 0
-21125 -21126  21127 -161 -21129 0
-21125 -21126  21127 -161  21130 0

c  -1+1 --> 0
c    ( b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧  b^{161, 1}_0 ∧  p_161) -> (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧ -b^{161, 2}_0)
c  in CNF:
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_2
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_1
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_0
c  in DIMACS:
-21125  21126 -21127 -161 -21128 0
-21125  21126 -21127 -161 -21129 0
-21125  21126 -21127 -161 -21130 0

c  0+1 --> 1
c    (-b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧  p_161) -> (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0)
c  in CNF:
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_2
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_1
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨  b^{161, 2}_0
c  in DIMACS:
 21125  21126  21127 -161 -21128 0
 21125  21126  21127 -161 -21129 0
 21125  21126  21127 -161  21130 0

c  1+1 --> 2
c    (-b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧  b^{161, 1}_0 ∧  p_161) -> (-b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0)
c  in CNF:
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_2
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨  b^{161, 2}_1
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ -p_161 ∨ -b^{161, 2}_0
c  in DIMACS:
 21125  21126 -21127 -161 -21128 0
 21125  21126 -21127 -161  21129 0
 21125  21126 -21127 -161 -21130 0

c  2+1 --> break 
c    (-b^{161, 1}_2 ∧  b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧  p_161) -> break
c  in CNF:
c     b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ -p_161 ∨ break
c  in DIMACS:
 21125 -21126  21127 -161 1162 0


c  2-1 --> 1
c    (-b^{161, 1}_2 ∧  b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧ -p_161) -> (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0)
c  in CNF:
c     b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_2
c     b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_1
c     b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨  b^{161, 2}_0
c  in DIMACS:
 21125 -21126  21127  161 -21128 0
 21125 -21126  21127  161 -21129 0
 21125 -21126  21127  161  21130 0

c  1-1 --> 0
c    (-b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧  b^{161, 1}_0 ∧ -p_161) -> (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧ -b^{161, 2}_0)
c  in CNF:
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_2
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_1
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_0
c  in DIMACS:
 21125  21126 -21127  161 -21128 0
 21125  21126 -21127  161 -21129 0
 21125  21126 -21127  161 -21130 0

c  0-1 --> -1
c    (-b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧ -p_161) -> ( b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0)
c  in CNF:
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨  b^{161, 2}_2
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_1
c     b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨  b^{161, 2}_0
c  in DIMACS:
 21125  21126  21127  161  21128 0
 21125  21126  21127  161 -21129 0
 21125  21126  21127  161  21130 0

c  -1-1 --> -2
c    ( b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧  b^{161, 1}_0 ∧ -p_161) -> ( b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0)
c  in CNF:
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨  b^{161, 2}_2
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨  b^{161, 2}_1
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨  p_161 ∨ -b^{161, 2}_0
c  in DIMACS:
-21125  21126 -21127  161  21128 0
-21125  21126 -21127  161  21129 0
-21125  21126 -21127  161 -21130 0

c  -2-1 --> break 
c    ( b^{161, 1}_2 ∧  b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧ -p_161) -> break
c  in CNF:
c    -b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨  b^{161, 1}_0 ∨  p_161 ∨ break
c  in DIMACS:
-21125 -21126  21127  161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 1}_2 ∧ -b^{161, 1}_1 ∧ -b^{161, 1}_0 ∧ true) 
c  in CNF:
c    -b^{161, 1}_2 ∨  b^{161, 1}_1 ∨  b^{161, 1}_0 ∨ false 
c  in DIMACS:
-21125  21126  21127  0

c  3 does not represent an automaton state.
c    -(-b^{161, 1}_2 ∧  b^{161, 1}_1 ∧  b^{161, 1}_0 ∧ true) 
c  in CNF:
c     b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ false 
c  in DIMACS:
 21125 -21126 -21127  0
c  -3 does not represent an automaton state.
c    -( b^{161, 1}_2 ∧  b^{161, 1}_1 ∧  b^{161, 1}_0 ∧ true) 
c  in CNF:
c    -b^{161, 1}_2 ∨ -b^{161, 1}_1 ∨ -b^{161, 1}_0 ∨ false 
c  in DIMACS:
-21125 -21126 -21127  0

c i = 2
c  -2+1 --> -1
c    ( b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧  p_322) -> ( b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0)
c  in CNF:
c    -b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨  b^{161, 3}_2
c    -b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_1
c    -b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨  b^{161, 3}_0
c  in DIMACS:
-21128 -21129  21130 -322  21131 0
-21128 -21129  21130 -322 -21132 0
-21128 -21129  21130 -322  21133 0

c  -1+1 --> 0
c    ( b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0 ∧  p_322) -> (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧ -b^{161, 3}_0)
c  in CNF:
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_2
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_1
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_0
c  in DIMACS:
-21128  21129 -21130 -322 -21131 0
-21128  21129 -21130 -322 -21132 0
-21128  21129 -21130 -322 -21133 0

c  0+1 --> 1
c    (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧  p_322) -> (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0)
c  in CNF:
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_2
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_1
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨  b^{161, 3}_0
c  in DIMACS:
 21128  21129  21130 -322 -21131 0
 21128  21129  21130 -322 -21132 0
 21128  21129  21130 -322  21133 0

c  1+1 --> 2
c    (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0 ∧  p_322) -> (-b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0)
c  in CNF:
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_2
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨  b^{161, 3}_1
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ -p_322 ∨ -b^{161, 3}_0
c  in DIMACS:
 21128  21129 -21130 -322 -21131 0
 21128  21129 -21130 -322  21132 0
 21128  21129 -21130 -322 -21133 0

c  2+1 --> break 
c    (-b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧  p_322) -> break
c  in CNF:
c     b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 21128 -21129  21130 -322 1162 0


c  2-1 --> 1
c    (-b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧ -p_322) -> (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0)
c  in CNF:
c     b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_2
c     b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_1
c     b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨  b^{161, 3}_0
c  in DIMACS:
 21128 -21129  21130  322 -21131 0
 21128 -21129  21130  322 -21132 0
 21128 -21129  21130  322  21133 0

c  1-1 --> 0
c    (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0 ∧ -p_322) -> (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧ -b^{161, 3}_0)
c  in CNF:
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_2
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_1
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_0
c  in DIMACS:
 21128  21129 -21130  322 -21131 0
 21128  21129 -21130  322 -21132 0
 21128  21129 -21130  322 -21133 0

c  0-1 --> -1
c    (-b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧ -p_322) -> ( b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0)
c  in CNF:
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨  b^{161, 3}_2
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_1
c     b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨  b^{161, 3}_0
c  in DIMACS:
 21128  21129  21130  322  21131 0
 21128  21129  21130  322 -21132 0
 21128  21129  21130  322  21133 0

c  -1-1 --> -2
c    ( b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧  b^{161, 2}_0 ∧ -p_322) -> ( b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0)
c  in CNF:
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨  b^{161, 3}_2
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨  b^{161, 3}_1
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨  p_322 ∨ -b^{161, 3}_0
c  in DIMACS:
-21128  21129 -21130  322  21131 0
-21128  21129 -21130  322  21132 0
-21128  21129 -21130  322 -21133 0

c  -2-1 --> break 
c    ( b^{161, 2}_2 ∧  b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨  b^{161, 2}_0 ∨  p_322 ∨ break
c  in DIMACS:
-21128 -21129  21130  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 2}_2 ∧ -b^{161, 2}_1 ∧ -b^{161, 2}_0 ∧ true) 
c  in CNF:
c    -b^{161, 2}_2 ∨  b^{161, 2}_1 ∨  b^{161, 2}_0 ∨ false 
c  in DIMACS:
-21128  21129  21130  0

c  3 does not represent an automaton state.
c    -(-b^{161, 2}_2 ∧  b^{161, 2}_1 ∧  b^{161, 2}_0 ∧ true) 
c  in CNF:
c     b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ false 
c  in DIMACS:
 21128 -21129 -21130  0
c  -3 does not represent an automaton state.
c    -( b^{161, 2}_2 ∧  b^{161, 2}_1 ∧  b^{161, 2}_0 ∧ true) 
c  in CNF:
c    -b^{161, 2}_2 ∨ -b^{161, 2}_1 ∨ -b^{161, 2}_0 ∨ false 
c  in DIMACS:
-21128 -21129 -21130  0

c i = 3
c  -2+1 --> -1
c    ( b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧  p_483) -> ( b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0)
c  in CNF:
c    -b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨  b^{161, 4}_2
c    -b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_1
c    -b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨  b^{161, 4}_0
c  in DIMACS:
-21131 -21132  21133 -483  21134 0
-21131 -21132  21133 -483 -21135 0
-21131 -21132  21133 -483  21136 0

c  -1+1 --> 0
c    ( b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0 ∧  p_483) -> (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧ -b^{161, 4}_0)
c  in CNF:
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_2
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_1
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_0
c  in DIMACS:
-21131  21132 -21133 -483 -21134 0
-21131  21132 -21133 -483 -21135 0
-21131  21132 -21133 -483 -21136 0

c  0+1 --> 1
c    (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧  p_483) -> (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0)
c  in CNF:
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_2
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_1
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨  b^{161, 4}_0
c  in DIMACS:
 21131  21132  21133 -483 -21134 0
 21131  21132  21133 -483 -21135 0
 21131  21132  21133 -483  21136 0

c  1+1 --> 2
c    (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0 ∧  p_483) -> (-b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0)
c  in CNF:
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_2
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨  b^{161, 4}_1
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ -p_483 ∨ -b^{161, 4}_0
c  in DIMACS:
 21131  21132 -21133 -483 -21134 0
 21131  21132 -21133 -483  21135 0
 21131  21132 -21133 -483 -21136 0

c  2+1 --> break 
c    (-b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧  p_483) -> break
c  in CNF:
c     b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ -p_483 ∨ break
c  in DIMACS:
 21131 -21132  21133 -483 1162 0


c  2-1 --> 1
c    (-b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧ -p_483) -> (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0)
c  in CNF:
c     b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_2
c     b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_1
c     b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨  b^{161, 4}_0
c  in DIMACS:
 21131 -21132  21133  483 -21134 0
 21131 -21132  21133  483 -21135 0
 21131 -21132  21133  483  21136 0

c  1-1 --> 0
c    (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0 ∧ -p_483) -> (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧ -b^{161, 4}_0)
c  in CNF:
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_2
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_1
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_0
c  in DIMACS:
 21131  21132 -21133  483 -21134 0
 21131  21132 -21133  483 -21135 0
 21131  21132 -21133  483 -21136 0

c  0-1 --> -1
c    (-b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧ -p_483) -> ( b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0)
c  in CNF:
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨  b^{161, 4}_2
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_1
c     b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨  b^{161, 4}_0
c  in DIMACS:
 21131  21132  21133  483  21134 0
 21131  21132  21133  483 -21135 0
 21131  21132  21133  483  21136 0

c  -1-1 --> -2
c    ( b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧  b^{161, 3}_0 ∧ -p_483) -> ( b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0)
c  in CNF:
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨  b^{161, 4}_2
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨  b^{161, 4}_1
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨  p_483 ∨ -b^{161, 4}_0
c  in DIMACS:
-21131  21132 -21133  483  21134 0
-21131  21132 -21133  483  21135 0
-21131  21132 -21133  483 -21136 0

c  -2-1 --> break 
c    ( b^{161, 3}_2 ∧  b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧ -p_483) -> break
c  in CNF:
c    -b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨  b^{161, 3}_0 ∨  p_483 ∨ break
c  in DIMACS:
-21131 -21132  21133  483 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 3}_2 ∧ -b^{161, 3}_1 ∧ -b^{161, 3}_0 ∧ true) 
c  in CNF:
c    -b^{161, 3}_2 ∨  b^{161, 3}_1 ∨  b^{161, 3}_0 ∨ false 
c  in DIMACS:
-21131  21132  21133  0

c  3 does not represent an automaton state.
c    -(-b^{161, 3}_2 ∧  b^{161, 3}_1 ∧  b^{161, 3}_0 ∧ true) 
c  in CNF:
c     b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ false 
c  in DIMACS:
 21131 -21132 -21133  0
c  -3 does not represent an automaton state.
c    -( b^{161, 3}_2 ∧  b^{161, 3}_1 ∧  b^{161, 3}_0 ∧ true) 
c  in CNF:
c    -b^{161, 3}_2 ∨ -b^{161, 3}_1 ∨ -b^{161, 3}_0 ∨ false 
c  in DIMACS:
-21131 -21132 -21133  0

c i = 4
c  -2+1 --> -1
c    ( b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧  p_644) -> ( b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0)
c  in CNF:
c    -b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨  b^{161, 5}_2
c    -b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_1
c    -b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨  b^{161, 5}_0
c  in DIMACS:
-21134 -21135  21136 -644  21137 0
-21134 -21135  21136 -644 -21138 0
-21134 -21135  21136 -644  21139 0

c  -1+1 --> 0
c    ( b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0 ∧  p_644) -> (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧ -b^{161, 5}_0)
c  in CNF:
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_2
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_1
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_0
c  in DIMACS:
-21134  21135 -21136 -644 -21137 0
-21134  21135 -21136 -644 -21138 0
-21134  21135 -21136 -644 -21139 0

c  0+1 --> 1
c    (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧  p_644) -> (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0)
c  in CNF:
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_2
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_1
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨  b^{161, 5}_0
c  in DIMACS:
 21134  21135  21136 -644 -21137 0
 21134  21135  21136 -644 -21138 0
 21134  21135  21136 -644  21139 0

c  1+1 --> 2
c    (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0 ∧  p_644) -> (-b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0)
c  in CNF:
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_2
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨  b^{161, 5}_1
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ -p_644 ∨ -b^{161, 5}_0
c  in DIMACS:
 21134  21135 -21136 -644 -21137 0
 21134  21135 -21136 -644  21138 0
 21134  21135 -21136 -644 -21139 0

c  2+1 --> break 
c    (-b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧  p_644) -> break
c  in CNF:
c     b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 21134 -21135  21136 -644 1162 0


c  2-1 --> 1
c    (-b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧ -p_644) -> (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0)
c  in CNF:
c     b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_2
c     b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_1
c     b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨  b^{161, 5}_0
c  in DIMACS:
 21134 -21135  21136  644 -21137 0
 21134 -21135  21136  644 -21138 0
 21134 -21135  21136  644  21139 0

c  1-1 --> 0
c    (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0 ∧ -p_644) -> (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧ -b^{161, 5}_0)
c  in CNF:
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_2
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_1
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_0
c  in DIMACS:
 21134  21135 -21136  644 -21137 0
 21134  21135 -21136  644 -21138 0
 21134  21135 -21136  644 -21139 0

c  0-1 --> -1
c    (-b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧ -p_644) -> ( b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0)
c  in CNF:
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨  b^{161, 5}_2
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_1
c     b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨  b^{161, 5}_0
c  in DIMACS:
 21134  21135  21136  644  21137 0
 21134  21135  21136  644 -21138 0
 21134  21135  21136  644  21139 0

c  -1-1 --> -2
c    ( b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧  b^{161, 4}_0 ∧ -p_644) -> ( b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0)
c  in CNF:
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨  b^{161, 5}_2
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨  b^{161, 5}_1
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨  p_644 ∨ -b^{161, 5}_0
c  in DIMACS:
-21134  21135 -21136  644  21137 0
-21134  21135 -21136  644  21138 0
-21134  21135 -21136  644 -21139 0

c  -2-1 --> break 
c    ( b^{161, 4}_2 ∧  b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨  b^{161, 4}_0 ∨  p_644 ∨ break
c  in DIMACS:
-21134 -21135  21136  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 4}_2 ∧ -b^{161, 4}_1 ∧ -b^{161, 4}_0 ∧ true) 
c  in CNF:
c    -b^{161, 4}_2 ∨  b^{161, 4}_1 ∨  b^{161, 4}_0 ∨ false 
c  in DIMACS:
-21134  21135  21136  0

c  3 does not represent an automaton state.
c    -(-b^{161, 4}_2 ∧  b^{161, 4}_1 ∧  b^{161, 4}_0 ∧ true) 
c  in CNF:
c     b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ false 
c  in DIMACS:
 21134 -21135 -21136  0
c  -3 does not represent an automaton state.
c    -( b^{161, 4}_2 ∧  b^{161, 4}_1 ∧  b^{161, 4}_0 ∧ true) 
c  in CNF:
c    -b^{161, 4}_2 ∨ -b^{161, 4}_1 ∨ -b^{161, 4}_0 ∨ false 
c  in DIMACS:
-21134 -21135 -21136  0

c i = 5
c  -2+1 --> -1
c    ( b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧  p_805) -> ( b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0)
c  in CNF:
c    -b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨  b^{161, 6}_2
c    -b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_1
c    -b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨  b^{161, 6}_0
c  in DIMACS:
-21137 -21138  21139 -805  21140 0
-21137 -21138  21139 -805 -21141 0
-21137 -21138  21139 -805  21142 0

c  -1+1 --> 0
c    ( b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0 ∧  p_805) -> (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧ -b^{161, 6}_0)
c  in CNF:
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_2
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_1
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_0
c  in DIMACS:
-21137  21138 -21139 -805 -21140 0
-21137  21138 -21139 -805 -21141 0
-21137  21138 -21139 -805 -21142 0

c  0+1 --> 1
c    (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧  p_805) -> (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0)
c  in CNF:
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_2
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_1
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨  b^{161, 6}_0
c  in DIMACS:
 21137  21138  21139 -805 -21140 0
 21137  21138  21139 -805 -21141 0
 21137  21138  21139 -805  21142 0

c  1+1 --> 2
c    (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0 ∧  p_805) -> (-b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0)
c  in CNF:
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_2
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨  b^{161, 6}_1
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ -p_805 ∨ -b^{161, 6}_0
c  in DIMACS:
 21137  21138 -21139 -805 -21140 0
 21137  21138 -21139 -805  21141 0
 21137  21138 -21139 -805 -21142 0

c  2+1 --> break 
c    (-b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧  p_805) -> break
c  in CNF:
c     b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ -p_805 ∨ break
c  in DIMACS:
 21137 -21138  21139 -805 1162 0


c  2-1 --> 1
c    (-b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧ -p_805) -> (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0)
c  in CNF:
c     b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_2
c     b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_1
c     b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨  b^{161, 6}_0
c  in DIMACS:
 21137 -21138  21139  805 -21140 0
 21137 -21138  21139  805 -21141 0
 21137 -21138  21139  805  21142 0

c  1-1 --> 0
c    (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0 ∧ -p_805) -> (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧ -b^{161, 6}_0)
c  in CNF:
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_2
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_1
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_0
c  in DIMACS:
 21137  21138 -21139  805 -21140 0
 21137  21138 -21139  805 -21141 0
 21137  21138 -21139  805 -21142 0

c  0-1 --> -1
c    (-b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧ -p_805) -> ( b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0)
c  in CNF:
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨  b^{161, 6}_2
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_1
c     b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨  b^{161, 6}_0
c  in DIMACS:
 21137  21138  21139  805  21140 0
 21137  21138  21139  805 -21141 0
 21137  21138  21139  805  21142 0

c  -1-1 --> -2
c    ( b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧  b^{161, 5}_0 ∧ -p_805) -> ( b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0)
c  in CNF:
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨  b^{161, 6}_2
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨  b^{161, 6}_1
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨  p_805 ∨ -b^{161, 6}_0
c  in DIMACS:
-21137  21138 -21139  805  21140 0
-21137  21138 -21139  805  21141 0
-21137  21138 -21139  805 -21142 0

c  -2-1 --> break 
c    ( b^{161, 5}_2 ∧  b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧ -p_805) -> break
c  in CNF:
c    -b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨  b^{161, 5}_0 ∨  p_805 ∨ break
c  in DIMACS:
-21137 -21138  21139  805 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 5}_2 ∧ -b^{161, 5}_1 ∧ -b^{161, 5}_0 ∧ true) 
c  in CNF:
c    -b^{161, 5}_2 ∨  b^{161, 5}_1 ∨  b^{161, 5}_0 ∨ false 
c  in DIMACS:
-21137  21138  21139  0

c  3 does not represent an automaton state.
c    -(-b^{161, 5}_2 ∧  b^{161, 5}_1 ∧  b^{161, 5}_0 ∧ true) 
c  in CNF:
c     b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ false 
c  in DIMACS:
 21137 -21138 -21139  0
c  -3 does not represent an automaton state.
c    -( b^{161, 5}_2 ∧  b^{161, 5}_1 ∧  b^{161, 5}_0 ∧ true) 
c  in CNF:
c    -b^{161, 5}_2 ∨ -b^{161, 5}_1 ∨ -b^{161, 5}_0 ∨ false 
c  in DIMACS:
-21137 -21138 -21139  0

c i = 6
c  -2+1 --> -1
c    ( b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧  p_966) -> ( b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0)
c  in CNF:
c    -b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨  b^{161, 7}_2
c    -b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_1
c    -b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨  b^{161, 7}_0
c  in DIMACS:
-21140 -21141  21142 -966  21143 0
-21140 -21141  21142 -966 -21144 0
-21140 -21141  21142 -966  21145 0

c  -1+1 --> 0
c    ( b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0 ∧  p_966) -> (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧ -b^{161, 7}_0)
c  in CNF:
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_2
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_1
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_0
c  in DIMACS:
-21140  21141 -21142 -966 -21143 0
-21140  21141 -21142 -966 -21144 0
-21140  21141 -21142 -966 -21145 0

c  0+1 --> 1
c    (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧  p_966) -> (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0)
c  in CNF:
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_2
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_1
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨  b^{161, 7}_0
c  in DIMACS:
 21140  21141  21142 -966 -21143 0
 21140  21141  21142 -966 -21144 0
 21140  21141  21142 -966  21145 0

c  1+1 --> 2
c    (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0 ∧  p_966) -> (-b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0)
c  in CNF:
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_2
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨  b^{161, 7}_1
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ -p_966 ∨ -b^{161, 7}_0
c  in DIMACS:
 21140  21141 -21142 -966 -21143 0
 21140  21141 -21142 -966  21144 0
 21140  21141 -21142 -966 -21145 0

c  2+1 --> break 
c    (-b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧  p_966) -> break
c  in CNF:
c     b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 21140 -21141  21142 -966 1162 0


c  2-1 --> 1
c    (-b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧ -p_966) -> (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0)
c  in CNF:
c     b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_2
c     b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_1
c     b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨  b^{161, 7}_0
c  in DIMACS:
 21140 -21141  21142  966 -21143 0
 21140 -21141  21142  966 -21144 0
 21140 -21141  21142  966  21145 0

c  1-1 --> 0
c    (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0 ∧ -p_966) -> (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧ -b^{161, 7}_0)
c  in CNF:
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_2
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_1
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_0
c  in DIMACS:
 21140  21141 -21142  966 -21143 0
 21140  21141 -21142  966 -21144 0
 21140  21141 -21142  966 -21145 0

c  0-1 --> -1
c    (-b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧ -p_966) -> ( b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0)
c  in CNF:
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨  b^{161, 7}_2
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_1
c     b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨  b^{161, 7}_0
c  in DIMACS:
 21140  21141  21142  966  21143 0
 21140  21141  21142  966 -21144 0
 21140  21141  21142  966  21145 0

c  -1-1 --> -2
c    ( b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧  b^{161, 6}_0 ∧ -p_966) -> ( b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0)
c  in CNF:
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨  b^{161, 7}_2
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨  b^{161, 7}_1
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨  p_966 ∨ -b^{161, 7}_0
c  in DIMACS:
-21140  21141 -21142  966  21143 0
-21140  21141 -21142  966  21144 0
-21140  21141 -21142  966 -21145 0

c  -2-1 --> break 
c    ( b^{161, 6}_2 ∧  b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨  b^{161, 6}_0 ∨  p_966 ∨ break
c  in DIMACS:
-21140 -21141  21142  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 6}_2 ∧ -b^{161, 6}_1 ∧ -b^{161, 6}_0 ∧ true) 
c  in CNF:
c    -b^{161, 6}_2 ∨  b^{161, 6}_1 ∨  b^{161, 6}_0 ∨ false 
c  in DIMACS:
-21140  21141  21142  0

c  3 does not represent an automaton state.
c    -(-b^{161, 6}_2 ∧  b^{161, 6}_1 ∧  b^{161, 6}_0 ∧ true) 
c  in CNF:
c     b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ false 
c  in DIMACS:
 21140 -21141 -21142  0
c  -3 does not represent an automaton state.
c    -( b^{161, 6}_2 ∧  b^{161, 6}_1 ∧  b^{161, 6}_0 ∧ true) 
c  in CNF:
c    -b^{161, 6}_2 ∨ -b^{161, 6}_1 ∨ -b^{161, 6}_0 ∨ false 
c  in DIMACS:
-21140 -21141 -21142  0

c i = 7
c  -2+1 --> -1
c    ( b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧  p_1127) -> ( b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧  b^{161, 8}_0)
c  in CNF:
c    -b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨  b^{161, 8}_2
c    -b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_1
c    -b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨  b^{161, 8}_0
c  in DIMACS:
-21143 -21144  21145 -1127  21146 0
-21143 -21144  21145 -1127 -21147 0
-21143 -21144  21145 -1127  21148 0

c  -1+1 --> 0
c    ( b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0 ∧  p_1127) -> (-b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧ -b^{161, 8}_0)
c  in CNF:
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_2
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_1
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_0
c  in DIMACS:
-21143  21144 -21145 -1127 -21146 0
-21143  21144 -21145 -1127 -21147 0
-21143  21144 -21145 -1127 -21148 0

c  0+1 --> 1
c    (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧  p_1127) -> (-b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧  b^{161, 8}_0)
c  in CNF:
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_2
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_1
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨  b^{161, 8}_0
c  in DIMACS:
 21143  21144  21145 -1127 -21146 0
 21143  21144  21145 -1127 -21147 0
 21143  21144  21145 -1127  21148 0

c  1+1 --> 2
c    (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0 ∧  p_1127) -> (-b^{161, 8}_2 ∧  b^{161, 8}_1 ∧ -b^{161, 8}_0)
c  in CNF:
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_2
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨  b^{161, 8}_1
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ -p_1127 ∨ -b^{161, 8}_0
c  in DIMACS:
 21143  21144 -21145 -1127 -21146 0
 21143  21144 -21145 -1127  21147 0
 21143  21144 -21145 -1127 -21148 0

c  2+1 --> break 
c    (-b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧  p_1127) -> break
c  in CNF:
c     b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ -p_1127 ∨ break
c  in DIMACS:
 21143 -21144  21145 -1127 1162 0


c  2-1 --> 1
c    (-b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧ -p_1127) -> (-b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧  b^{161, 8}_0)
c  in CNF:
c     b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_2
c     b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_1
c     b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨  b^{161, 8}_0
c  in DIMACS:
 21143 -21144  21145  1127 -21146 0
 21143 -21144  21145  1127 -21147 0
 21143 -21144  21145  1127  21148 0

c  1-1 --> 0
c    (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0 ∧ -p_1127) -> (-b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧ -b^{161, 8}_0)
c  in CNF:
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_2
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_1
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_0
c  in DIMACS:
 21143  21144 -21145  1127 -21146 0
 21143  21144 -21145  1127 -21147 0
 21143  21144 -21145  1127 -21148 0

c  0-1 --> -1
c    (-b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧ -p_1127) -> ( b^{161, 8}_2 ∧ -b^{161, 8}_1 ∧  b^{161, 8}_0)
c  in CNF:
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨  b^{161, 8}_2
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_1
c     b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨  b^{161, 8}_0
c  in DIMACS:
 21143  21144  21145  1127  21146 0
 21143  21144  21145  1127 -21147 0
 21143  21144  21145  1127  21148 0

c  -1-1 --> -2
c    ( b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧  b^{161, 7}_0 ∧ -p_1127) -> ( b^{161, 8}_2 ∧  b^{161, 8}_1 ∧ -b^{161, 8}_0)
c  in CNF:
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨  b^{161, 8}_2
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨  b^{161, 8}_1
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨  p_1127 ∨ -b^{161, 8}_0
c  in DIMACS:
-21143  21144 -21145  1127  21146 0
-21143  21144 -21145  1127  21147 0
-21143  21144 -21145  1127 -21148 0

c  -2-1 --> break 
c    ( b^{161, 7}_2 ∧  b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧ -p_1127) -> break
c  in CNF:
c    -b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨  b^{161, 7}_0 ∨  p_1127 ∨ break
c  in DIMACS:
-21143 -21144  21145  1127 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{161, 7}_2 ∧ -b^{161, 7}_1 ∧ -b^{161, 7}_0 ∧ true) 
c  in CNF:
c    -b^{161, 7}_2 ∨  b^{161, 7}_1 ∨  b^{161, 7}_0 ∨ false 
c  in DIMACS:
-21143  21144  21145  0

c  3 does not represent an automaton state.
c    -(-b^{161, 7}_2 ∧  b^{161, 7}_1 ∧  b^{161, 7}_0 ∧ true) 
c  in CNF:
c     b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ false 
c  in DIMACS:
 21143 -21144 -21145  0
c  -3 does not represent an automaton state.
c    -( b^{161, 7}_2 ∧  b^{161, 7}_1 ∧  b^{161, 7}_0 ∧ true) 
c  in CNF:
c    -b^{161, 7}_2 ∨ -b^{161, 7}_1 ∨ -b^{161, 7}_0 ∨ false 
c  in DIMACS:
-21143 -21144 -21145  0

c INIT for k = 162
c    -b^{162, 1}_2
c    -b^{162, 1}_1
c    -b^{162, 1}_0
c  in DIMACS:
-21149 0
-21150 0
-21151 0

c Transitions for k = 162
c i = 1
c  -2+1 --> -1
c    ( b^{162, 1}_2 ∧  b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧  p_162) -> ( b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0)
c  in CNF:
c    -b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨  b^{162, 2}_2
c    -b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_1
c    -b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨  b^{162, 2}_0
c  in DIMACS:
-21149 -21150  21151 -162  21152 0
-21149 -21150  21151 -162 -21153 0
-21149 -21150  21151 -162  21154 0

c  -1+1 --> 0
c    ( b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧  b^{162, 1}_0 ∧  p_162) -> (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧ -b^{162, 2}_0)
c  in CNF:
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_2
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_1
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_0
c  in DIMACS:
-21149  21150 -21151 -162 -21152 0
-21149  21150 -21151 -162 -21153 0
-21149  21150 -21151 -162 -21154 0

c  0+1 --> 1
c    (-b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧  p_162) -> (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0)
c  in CNF:
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_2
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_1
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨  b^{162, 2}_0
c  in DIMACS:
 21149  21150  21151 -162 -21152 0
 21149  21150  21151 -162 -21153 0
 21149  21150  21151 -162  21154 0

c  1+1 --> 2
c    (-b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧  b^{162, 1}_0 ∧  p_162) -> (-b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0)
c  in CNF:
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_2
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨  b^{162, 2}_1
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ -p_162 ∨ -b^{162, 2}_0
c  in DIMACS:
 21149  21150 -21151 -162 -21152 0
 21149  21150 -21151 -162  21153 0
 21149  21150 -21151 -162 -21154 0

c  2+1 --> break 
c    (-b^{162, 1}_2 ∧  b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧  p_162) -> break
c  in CNF:
c     b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ -p_162 ∨ break
c  in DIMACS:
 21149 -21150  21151 -162 1162 0


c  2-1 --> 1
c    (-b^{162, 1}_2 ∧  b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧ -p_162) -> (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0)
c  in CNF:
c     b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_2
c     b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_1
c     b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨  b^{162, 2}_0
c  in DIMACS:
 21149 -21150  21151  162 -21152 0
 21149 -21150  21151  162 -21153 0
 21149 -21150  21151  162  21154 0

c  1-1 --> 0
c    (-b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧  b^{162, 1}_0 ∧ -p_162) -> (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧ -b^{162, 2}_0)
c  in CNF:
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_2
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_1
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_0
c  in DIMACS:
 21149  21150 -21151  162 -21152 0
 21149  21150 -21151  162 -21153 0
 21149  21150 -21151  162 -21154 0

c  0-1 --> -1
c    (-b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧ -p_162) -> ( b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0)
c  in CNF:
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨  b^{162, 2}_2
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_1
c     b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨  b^{162, 2}_0
c  in DIMACS:
 21149  21150  21151  162  21152 0
 21149  21150  21151  162 -21153 0
 21149  21150  21151  162  21154 0

c  -1-1 --> -2
c    ( b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧  b^{162, 1}_0 ∧ -p_162) -> ( b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0)
c  in CNF:
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨  b^{162, 2}_2
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨  b^{162, 2}_1
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨  p_162 ∨ -b^{162, 2}_0
c  in DIMACS:
-21149  21150 -21151  162  21152 0
-21149  21150 -21151  162  21153 0
-21149  21150 -21151  162 -21154 0

c  -2-1 --> break 
c    ( b^{162, 1}_2 ∧  b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧ -p_162) -> break
c  in CNF:
c    -b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨  b^{162, 1}_0 ∨  p_162 ∨ break
c  in DIMACS:
-21149 -21150  21151  162 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 1}_2 ∧ -b^{162, 1}_1 ∧ -b^{162, 1}_0 ∧ true) 
c  in CNF:
c    -b^{162, 1}_2 ∨  b^{162, 1}_1 ∨  b^{162, 1}_0 ∨ false 
c  in DIMACS:
-21149  21150  21151  0

c  3 does not represent an automaton state.
c    -(-b^{162, 1}_2 ∧  b^{162, 1}_1 ∧  b^{162, 1}_0 ∧ true) 
c  in CNF:
c     b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ false 
c  in DIMACS:
 21149 -21150 -21151  0
c  -3 does not represent an automaton state.
c    -( b^{162, 1}_2 ∧  b^{162, 1}_1 ∧  b^{162, 1}_0 ∧ true) 
c  in CNF:
c    -b^{162, 1}_2 ∨ -b^{162, 1}_1 ∨ -b^{162, 1}_0 ∨ false 
c  in DIMACS:
-21149 -21150 -21151  0

c i = 2
c  -2+1 --> -1
c    ( b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧  p_324) -> ( b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0)
c  in CNF:
c    -b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨  b^{162, 3}_2
c    -b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_1
c    -b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨  b^{162, 3}_0
c  in DIMACS:
-21152 -21153  21154 -324  21155 0
-21152 -21153  21154 -324 -21156 0
-21152 -21153  21154 -324  21157 0

c  -1+1 --> 0
c    ( b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0 ∧  p_324) -> (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧ -b^{162, 3}_0)
c  in CNF:
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_2
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_1
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_0
c  in DIMACS:
-21152  21153 -21154 -324 -21155 0
-21152  21153 -21154 -324 -21156 0
-21152  21153 -21154 -324 -21157 0

c  0+1 --> 1
c    (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧  p_324) -> (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0)
c  in CNF:
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_2
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_1
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨  b^{162, 3}_0
c  in DIMACS:
 21152  21153  21154 -324 -21155 0
 21152  21153  21154 -324 -21156 0
 21152  21153  21154 -324  21157 0

c  1+1 --> 2
c    (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0 ∧  p_324) -> (-b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0)
c  in CNF:
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_2
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨  b^{162, 3}_1
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ -p_324 ∨ -b^{162, 3}_0
c  in DIMACS:
 21152  21153 -21154 -324 -21155 0
 21152  21153 -21154 -324  21156 0
 21152  21153 -21154 -324 -21157 0

c  2+1 --> break 
c    (-b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧  p_324) -> break
c  in CNF:
c     b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 21152 -21153  21154 -324 1162 0


c  2-1 --> 1
c    (-b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧ -p_324) -> (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0)
c  in CNF:
c     b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_2
c     b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_1
c     b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨  b^{162, 3}_0
c  in DIMACS:
 21152 -21153  21154  324 -21155 0
 21152 -21153  21154  324 -21156 0
 21152 -21153  21154  324  21157 0

c  1-1 --> 0
c    (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0 ∧ -p_324) -> (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧ -b^{162, 3}_0)
c  in CNF:
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_2
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_1
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_0
c  in DIMACS:
 21152  21153 -21154  324 -21155 0
 21152  21153 -21154  324 -21156 0
 21152  21153 -21154  324 -21157 0

c  0-1 --> -1
c    (-b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧ -p_324) -> ( b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0)
c  in CNF:
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨  b^{162, 3}_2
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_1
c     b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨  b^{162, 3}_0
c  in DIMACS:
 21152  21153  21154  324  21155 0
 21152  21153  21154  324 -21156 0
 21152  21153  21154  324  21157 0

c  -1-1 --> -2
c    ( b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧  b^{162, 2}_0 ∧ -p_324) -> ( b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0)
c  in CNF:
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨  b^{162, 3}_2
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨  b^{162, 3}_1
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨  p_324 ∨ -b^{162, 3}_0
c  in DIMACS:
-21152  21153 -21154  324  21155 0
-21152  21153 -21154  324  21156 0
-21152  21153 -21154  324 -21157 0

c  -2-1 --> break 
c    ( b^{162, 2}_2 ∧  b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨  b^{162, 2}_0 ∨  p_324 ∨ break
c  in DIMACS:
-21152 -21153  21154  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 2}_2 ∧ -b^{162, 2}_1 ∧ -b^{162, 2}_0 ∧ true) 
c  in CNF:
c    -b^{162, 2}_2 ∨  b^{162, 2}_1 ∨  b^{162, 2}_0 ∨ false 
c  in DIMACS:
-21152  21153  21154  0

c  3 does not represent an automaton state.
c    -(-b^{162, 2}_2 ∧  b^{162, 2}_1 ∧  b^{162, 2}_0 ∧ true) 
c  in CNF:
c     b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ false 
c  in DIMACS:
 21152 -21153 -21154  0
c  -3 does not represent an automaton state.
c    -( b^{162, 2}_2 ∧  b^{162, 2}_1 ∧  b^{162, 2}_0 ∧ true) 
c  in CNF:
c    -b^{162, 2}_2 ∨ -b^{162, 2}_1 ∨ -b^{162, 2}_0 ∨ false 
c  in DIMACS:
-21152 -21153 -21154  0

c i = 3
c  -2+1 --> -1
c    ( b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧  p_486) -> ( b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0)
c  in CNF:
c    -b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨  b^{162, 4}_2
c    -b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_1
c    -b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨  b^{162, 4}_0
c  in DIMACS:
-21155 -21156  21157 -486  21158 0
-21155 -21156  21157 -486 -21159 0
-21155 -21156  21157 -486  21160 0

c  -1+1 --> 0
c    ( b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0 ∧  p_486) -> (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧ -b^{162, 4}_0)
c  in CNF:
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_2
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_1
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_0
c  in DIMACS:
-21155  21156 -21157 -486 -21158 0
-21155  21156 -21157 -486 -21159 0
-21155  21156 -21157 -486 -21160 0

c  0+1 --> 1
c    (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧  p_486) -> (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0)
c  in CNF:
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_2
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_1
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨  b^{162, 4}_0
c  in DIMACS:
 21155  21156  21157 -486 -21158 0
 21155  21156  21157 -486 -21159 0
 21155  21156  21157 -486  21160 0

c  1+1 --> 2
c    (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0 ∧  p_486) -> (-b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0)
c  in CNF:
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_2
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨  b^{162, 4}_1
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ -p_486 ∨ -b^{162, 4}_0
c  in DIMACS:
 21155  21156 -21157 -486 -21158 0
 21155  21156 -21157 -486  21159 0
 21155  21156 -21157 -486 -21160 0

c  2+1 --> break 
c    (-b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧  p_486) -> break
c  in CNF:
c     b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 21155 -21156  21157 -486 1162 0


c  2-1 --> 1
c    (-b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧ -p_486) -> (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0)
c  in CNF:
c     b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_2
c     b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_1
c     b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨  b^{162, 4}_0
c  in DIMACS:
 21155 -21156  21157  486 -21158 0
 21155 -21156  21157  486 -21159 0
 21155 -21156  21157  486  21160 0

c  1-1 --> 0
c    (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0 ∧ -p_486) -> (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧ -b^{162, 4}_0)
c  in CNF:
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_2
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_1
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_0
c  in DIMACS:
 21155  21156 -21157  486 -21158 0
 21155  21156 -21157  486 -21159 0
 21155  21156 -21157  486 -21160 0

c  0-1 --> -1
c    (-b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧ -p_486) -> ( b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0)
c  in CNF:
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨  b^{162, 4}_2
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_1
c     b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨  b^{162, 4}_0
c  in DIMACS:
 21155  21156  21157  486  21158 0
 21155  21156  21157  486 -21159 0
 21155  21156  21157  486  21160 0

c  -1-1 --> -2
c    ( b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧  b^{162, 3}_0 ∧ -p_486) -> ( b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0)
c  in CNF:
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨  b^{162, 4}_2
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨  b^{162, 4}_1
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨  p_486 ∨ -b^{162, 4}_0
c  in DIMACS:
-21155  21156 -21157  486  21158 0
-21155  21156 -21157  486  21159 0
-21155  21156 -21157  486 -21160 0

c  -2-1 --> break 
c    ( b^{162, 3}_2 ∧  b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨  b^{162, 3}_0 ∨  p_486 ∨ break
c  in DIMACS:
-21155 -21156  21157  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 3}_2 ∧ -b^{162, 3}_1 ∧ -b^{162, 3}_0 ∧ true) 
c  in CNF:
c    -b^{162, 3}_2 ∨  b^{162, 3}_1 ∨  b^{162, 3}_0 ∨ false 
c  in DIMACS:
-21155  21156  21157  0

c  3 does not represent an automaton state.
c    -(-b^{162, 3}_2 ∧  b^{162, 3}_1 ∧  b^{162, 3}_0 ∧ true) 
c  in CNF:
c     b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ false 
c  in DIMACS:
 21155 -21156 -21157  0
c  -3 does not represent an automaton state.
c    -( b^{162, 3}_2 ∧  b^{162, 3}_1 ∧  b^{162, 3}_0 ∧ true) 
c  in CNF:
c    -b^{162, 3}_2 ∨ -b^{162, 3}_1 ∨ -b^{162, 3}_0 ∨ false 
c  in DIMACS:
-21155 -21156 -21157  0

c i = 4
c  -2+1 --> -1
c    ( b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧  p_648) -> ( b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0)
c  in CNF:
c    -b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨  b^{162, 5}_2
c    -b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_1
c    -b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨  b^{162, 5}_0
c  in DIMACS:
-21158 -21159  21160 -648  21161 0
-21158 -21159  21160 -648 -21162 0
-21158 -21159  21160 -648  21163 0

c  -1+1 --> 0
c    ( b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0 ∧  p_648) -> (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧ -b^{162, 5}_0)
c  in CNF:
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_2
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_1
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_0
c  in DIMACS:
-21158  21159 -21160 -648 -21161 0
-21158  21159 -21160 -648 -21162 0
-21158  21159 -21160 -648 -21163 0

c  0+1 --> 1
c    (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧  p_648) -> (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0)
c  in CNF:
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_2
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_1
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨  b^{162, 5}_0
c  in DIMACS:
 21158  21159  21160 -648 -21161 0
 21158  21159  21160 -648 -21162 0
 21158  21159  21160 -648  21163 0

c  1+1 --> 2
c    (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0 ∧  p_648) -> (-b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0)
c  in CNF:
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_2
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨  b^{162, 5}_1
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ -p_648 ∨ -b^{162, 5}_0
c  in DIMACS:
 21158  21159 -21160 -648 -21161 0
 21158  21159 -21160 -648  21162 0
 21158  21159 -21160 -648 -21163 0

c  2+1 --> break 
c    (-b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧  p_648) -> break
c  in CNF:
c     b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 21158 -21159  21160 -648 1162 0


c  2-1 --> 1
c    (-b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧ -p_648) -> (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0)
c  in CNF:
c     b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_2
c     b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_1
c     b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨  b^{162, 5}_0
c  in DIMACS:
 21158 -21159  21160  648 -21161 0
 21158 -21159  21160  648 -21162 0
 21158 -21159  21160  648  21163 0

c  1-1 --> 0
c    (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0 ∧ -p_648) -> (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧ -b^{162, 5}_0)
c  in CNF:
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_2
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_1
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_0
c  in DIMACS:
 21158  21159 -21160  648 -21161 0
 21158  21159 -21160  648 -21162 0
 21158  21159 -21160  648 -21163 0

c  0-1 --> -1
c    (-b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧ -p_648) -> ( b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0)
c  in CNF:
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨  b^{162, 5}_2
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_1
c     b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨  b^{162, 5}_0
c  in DIMACS:
 21158  21159  21160  648  21161 0
 21158  21159  21160  648 -21162 0
 21158  21159  21160  648  21163 0

c  -1-1 --> -2
c    ( b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧  b^{162, 4}_0 ∧ -p_648) -> ( b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0)
c  in CNF:
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨  b^{162, 5}_2
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨  b^{162, 5}_1
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨  p_648 ∨ -b^{162, 5}_0
c  in DIMACS:
-21158  21159 -21160  648  21161 0
-21158  21159 -21160  648  21162 0
-21158  21159 -21160  648 -21163 0

c  -2-1 --> break 
c    ( b^{162, 4}_2 ∧  b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨  b^{162, 4}_0 ∨  p_648 ∨ break
c  in DIMACS:
-21158 -21159  21160  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 4}_2 ∧ -b^{162, 4}_1 ∧ -b^{162, 4}_0 ∧ true) 
c  in CNF:
c    -b^{162, 4}_2 ∨  b^{162, 4}_1 ∨  b^{162, 4}_0 ∨ false 
c  in DIMACS:
-21158  21159  21160  0

c  3 does not represent an automaton state.
c    -(-b^{162, 4}_2 ∧  b^{162, 4}_1 ∧  b^{162, 4}_0 ∧ true) 
c  in CNF:
c     b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ false 
c  in DIMACS:
 21158 -21159 -21160  0
c  -3 does not represent an automaton state.
c    -( b^{162, 4}_2 ∧  b^{162, 4}_1 ∧  b^{162, 4}_0 ∧ true) 
c  in CNF:
c    -b^{162, 4}_2 ∨ -b^{162, 4}_1 ∨ -b^{162, 4}_0 ∨ false 
c  in DIMACS:
-21158 -21159 -21160  0

c i = 5
c  -2+1 --> -1
c    ( b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧  p_810) -> ( b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0)
c  in CNF:
c    -b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨  b^{162, 6}_2
c    -b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_1
c    -b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨  b^{162, 6}_0
c  in DIMACS:
-21161 -21162  21163 -810  21164 0
-21161 -21162  21163 -810 -21165 0
-21161 -21162  21163 -810  21166 0

c  -1+1 --> 0
c    ( b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0 ∧  p_810) -> (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧ -b^{162, 6}_0)
c  in CNF:
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_2
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_1
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_0
c  in DIMACS:
-21161  21162 -21163 -810 -21164 0
-21161  21162 -21163 -810 -21165 0
-21161  21162 -21163 -810 -21166 0

c  0+1 --> 1
c    (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧  p_810) -> (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0)
c  in CNF:
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_2
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_1
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨  b^{162, 6}_0
c  in DIMACS:
 21161  21162  21163 -810 -21164 0
 21161  21162  21163 -810 -21165 0
 21161  21162  21163 -810  21166 0

c  1+1 --> 2
c    (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0 ∧  p_810) -> (-b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0)
c  in CNF:
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_2
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨  b^{162, 6}_1
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ -p_810 ∨ -b^{162, 6}_0
c  in DIMACS:
 21161  21162 -21163 -810 -21164 0
 21161  21162 -21163 -810  21165 0
 21161  21162 -21163 -810 -21166 0

c  2+1 --> break 
c    (-b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧  p_810) -> break
c  in CNF:
c     b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 21161 -21162  21163 -810 1162 0


c  2-1 --> 1
c    (-b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧ -p_810) -> (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0)
c  in CNF:
c     b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_2
c     b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_1
c     b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨  b^{162, 6}_0
c  in DIMACS:
 21161 -21162  21163  810 -21164 0
 21161 -21162  21163  810 -21165 0
 21161 -21162  21163  810  21166 0

c  1-1 --> 0
c    (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0 ∧ -p_810) -> (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧ -b^{162, 6}_0)
c  in CNF:
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_2
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_1
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_0
c  in DIMACS:
 21161  21162 -21163  810 -21164 0
 21161  21162 -21163  810 -21165 0
 21161  21162 -21163  810 -21166 0

c  0-1 --> -1
c    (-b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧ -p_810) -> ( b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0)
c  in CNF:
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨  b^{162, 6}_2
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_1
c     b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨  b^{162, 6}_0
c  in DIMACS:
 21161  21162  21163  810  21164 0
 21161  21162  21163  810 -21165 0
 21161  21162  21163  810  21166 0

c  -1-1 --> -2
c    ( b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧  b^{162, 5}_0 ∧ -p_810) -> ( b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0)
c  in CNF:
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨  b^{162, 6}_2
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨  b^{162, 6}_1
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨  p_810 ∨ -b^{162, 6}_0
c  in DIMACS:
-21161  21162 -21163  810  21164 0
-21161  21162 -21163  810  21165 0
-21161  21162 -21163  810 -21166 0

c  -2-1 --> break 
c    ( b^{162, 5}_2 ∧  b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨  b^{162, 5}_0 ∨  p_810 ∨ break
c  in DIMACS:
-21161 -21162  21163  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 5}_2 ∧ -b^{162, 5}_1 ∧ -b^{162, 5}_0 ∧ true) 
c  in CNF:
c    -b^{162, 5}_2 ∨  b^{162, 5}_1 ∨  b^{162, 5}_0 ∨ false 
c  in DIMACS:
-21161  21162  21163  0

c  3 does not represent an automaton state.
c    -(-b^{162, 5}_2 ∧  b^{162, 5}_1 ∧  b^{162, 5}_0 ∧ true) 
c  in CNF:
c     b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ false 
c  in DIMACS:
 21161 -21162 -21163  0
c  -3 does not represent an automaton state.
c    -( b^{162, 5}_2 ∧  b^{162, 5}_1 ∧  b^{162, 5}_0 ∧ true) 
c  in CNF:
c    -b^{162, 5}_2 ∨ -b^{162, 5}_1 ∨ -b^{162, 5}_0 ∨ false 
c  in DIMACS:
-21161 -21162 -21163  0

c i = 6
c  -2+1 --> -1
c    ( b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧  p_972) -> ( b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0)
c  in CNF:
c    -b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨  b^{162, 7}_2
c    -b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_1
c    -b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨  b^{162, 7}_0
c  in DIMACS:
-21164 -21165  21166 -972  21167 0
-21164 -21165  21166 -972 -21168 0
-21164 -21165  21166 -972  21169 0

c  -1+1 --> 0
c    ( b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0 ∧  p_972) -> (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧ -b^{162, 7}_0)
c  in CNF:
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_2
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_1
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_0
c  in DIMACS:
-21164  21165 -21166 -972 -21167 0
-21164  21165 -21166 -972 -21168 0
-21164  21165 -21166 -972 -21169 0

c  0+1 --> 1
c    (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧  p_972) -> (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0)
c  in CNF:
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_2
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_1
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨  b^{162, 7}_0
c  in DIMACS:
 21164  21165  21166 -972 -21167 0
 21164  21165  21166 -972 -21168 0
 21164  21165  21166 -972  21169 0

c  1+1 --> 2
c    (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0 ∧  p_972) -> (-b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0)
c  in CNF:
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_2
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨  b^{162, 7}_1
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ -p_972 ∨ -b^{162, 7}_0
c  in DIMACS:
 21164  21165 -21166 -972 -21167 0
 21164  21165 -21166 -972  21168 0
 21164  21165 -21166 -972 -21169 0

c  2+1 --> break 
c    (-b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧  p_972) -> break
c  in CNF:
c     b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 21164 -21165  21166 -972 1162 0


c  2-1 --> 1
c    (-b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧ -p_972) -> (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0)
c  in CNF:
c     b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_2
c     b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_1
c     b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨  b^{162, 7}_0
c  in DIMACS:
 21164 -21165  21166  972 -21167 0
 21164 -21165  21166  972 -21168 0
 21164 -21165  21166  972  21169 0

c  1-1 --> 0
c    (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0 ∧ -p_972) -> (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧ -b^{162, 7}_0)
c  in CNF:
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_2
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_1
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_0
c  in DIMACS:
 21164  21165 -21166  972 -21167 0
 21164  21165 -21166  972 -21168 0
 21164  21165 -21166  972 -21169 0

c  0-1 --> -1
c    (-b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧ -p_972) -> ( b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0)
c  in CNF:
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨  b^{162, 7}_2
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_1
c     b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨  b^{162, 7}_0
c  in DIMACS:
 21164  21165  21166  972  21167 0
 21164  21165  21166  972 -21168 0
 21164  21165  21166  972  21169 0

c  -1-1 --> -2
c    ( b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧  b^{162, 6}_0 ∧ -p_972) -> ( b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0)
c  in CNF:
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨  b^{162, 7}_2
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨  b^{162, 7}_1
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨  p_972 ∨ -b^{162, 7}_0
c  in DIMACS:
-21164  21165 -21166  972  21167 0
-21164  21165 -21166  972  21168 0
-21164  21165 -21166  972 -21169 0

c  -2-1 --> break 
c    ( b^{162, 6}_2 ∧  b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨  b^{162, 6}_0 ∨  p_972 ∨ break
c  in DIMACS:
-21164 -21165  21166  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 6}_2 ∧ -b^{162, 6}_1 ∧ -b^{162, 6}_0 ∧ true) 
c  in CNF:
c    -b^{162, 6}_2 ∨  b^{162, 6}_1 ∨  b^{162, 6}_0 ∨ false 
c  in DIMACS:
-21164  21165  21166  0

c  3 does not represent an automaton state.
c    -(-b^{162, 6}_2 ∧  b^{162, 6}_1 ∧  b^{162, 6}_0 ∧ true) 
c  in CNF:
c     b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ false 
c  in DIMACS:
 21164 -21165 -21166  0
c  -3 does not represent an automaton state.
c    -( b^{162, 6}_2 ∧  b^{162, 6}_1 ∧  b^{162, 6}_0 ∧ true) 
c  in CNF:
c    -b^{162, 6}_2 ∨ -b^{162, 6}_1 ∨ -b^{162, 6}_0 ∨ false 
c  in DIMACS:
-21164 -21165 -21166  0

c i = 7
c  -2+1 --> -1
c    ( b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧  p_1134) -> ( b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧  b^{162, 8}_0)
c  in CNF:
c    -b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨  b^{162, 8}_2
c    -b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_1
c    -b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨  b^{162, 8}_0
c  in DIMACS:
-21167 -21168  21169 -1134  21170 0
-21167 -21168  21169 -1134 -21171 0
-21167 -21168  21169 -1134  21172 0

c  -1+1 --> 0
c    ( b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0 ∧  p_1134) -> (-b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧ -b^{162, 8}_0)
c  in CNF:
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_2
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_1
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_0
c  in DIMACS:
-21167  21168 -21169 -1134 -21170 0
-21167  21168 -21169 -1134 -21171 0
-21167  21168 -21169 -1134 -21172 0

c  0+1 --> 1
c    (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧  p_1134) -> (-b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧  b^{162, 8}_0)
c  in CNF:
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_2
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_1
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨  b^{162, 8}_0
c  in DIMACS:
 21167  21168  21169 -1134 -21170 0
 21167  21168  21169 -1134 -21171 0
 21167  21168  21169 -1134  21172 0

c  1+1 --> 2
c    (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0 ∧  p_1134) -> (-b^{162, 8}_2 ∧  b^{162, 8}_1 ∧ -b^{162, 8}_0)
c  in CNF:
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_2
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨  b^{162, 8}_1
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ -p_1134 ∨ -b^{162, 8}_0
c  in DIMACS:
 21167  21168 -21169 -1134 -21170 0
 21167  21168 -21169 -1134  21171 0
 21167  21168 -21169 -1134 -21172 0

c  2+1 --> break 
c    (-b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 21167 -21168  21169 -1134 1162 0


c  2-1 --> 1
c    (-b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧ -p_1134) -> (-b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧  b^{162, 8}_0)
c  in CNF:
c     b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_2
c     b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_1
c     b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨  b^{162, 8}_0
c  in DIMACS:
 21167 -21168  21169  1134 -21170 0
 21167 -21168  21169  1134 -21171 0
 21167 -21168  21169  1134  21172 0

c  1-1 --> 0
c    (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0 ∧ -p_1134) -> (-b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧ -b^{162, 8}_0)
c  in CNF:
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_2
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_1
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_0
c  in DIMACS:
 21167  21168 -21169  1134 -21170 0
 21167  21168 -21169  1134 -21171 0
 21167  21168 -21169  1134 -21172 0

c  0-1 --> -1
c    (-b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧ -p_1134) -> ( b^{162, 8}_2 ∧ -b^{162, 8}_1 ∧  b^{162, 8}_0)
c  in CNF:
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨  b^{162, 8}_2
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_1
c     b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨  b^{162, 8}_0
c  in DIMACS:
 21167  21168  21169  1134  21170 0
 21167  21168  21169  1134 -21171 0
 21167  21168  21169  1134  21172 0

c  -1-1 --> -2
c    ( b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧  b^{162, 7}_0 ∧ -p_1134) -> ( b^{162, 8}_2 ∧  b^{162, 8}_1 ∧ -b^{162, 8}_0)
c  in CNF:
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨  b^{162, 8}_2
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨  b^{162, 8}_1
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨  p_1134 ∨ -b^{162, 8}_0
c  in DIMACS:
-21167  21168 -21169  1134  21170 0
-21167  21168 -21169  1134  21171 0
-21167  21168 -21169  1134 -21172 0

c  -2-1 --> break 
c    ( b^{162, 7}_2 ∧  b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨  b^{162, 7}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-21167 -21168  21169  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{162, 7}_2 ∧ -b^{162, 7}_1 ∧ -b^{162, 7}_0 ∧ true) 
c  in CNF:
c    -b^{162, 7}_2 ∨  b^{162, 7}_1 ∨  b^{162, 7}_0 ∨ false 
c  in DIMACS:
-21167  21168  21169  0

c  3 does not represent an automaton state.
c    -(-b^{162, 7}_2 ∧  b^{162, 7}_1 ∧  b^{162, 7}_0 ∧ true) 
c  in CNF:
c     b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ false 
c  in DIMACS:
 21167 -21168 -21169  0
c  -3 does not represent an automaton state.
c    -( b^{162, 7}_2 ∧  b^{162, 7}_1 ∧  b^{162, 7}_0 ∧ true) 
c  in CNF:
c    -b^{162, 7}_2 ∨ -b^{162, 7}_1 ∨ -b^{162, 7}_0 ∨ false 
c  in DIMACS:
-21167 -21168 -21169  0

c INIT for k = 163
c    -b^{163, 1}_2
c    -b^{163, 1}_1
c    -b^{163, 1}_0
c  in DIMACS:
-21173 0
-21174 0
-21175 0

c Transitions for k = 163
c i = 1
c  -2+1 --> -1
c    ( b^{163, 1}_2 ∧  b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧  p_163) -> ( b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0)
c  in CNF:
c    -b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨  b^{163, 2}_2
c    -b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_1
c    -b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨  b^{163, 2}_0
c  in DIMACS:
-21173 -21174  21175 -163  21176 0
-21173 -21174  21175 -163 -21177 0
-21173 -21174  21175 -163  21178 0

c  -1+1 --> 0
c    ( b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧  b^{163, 1}_0 ∧  p_163) -> (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧ -b^{163, 2}_0)
c  in CNF:
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_2
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_1
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_0
c  in DIMACS:
-21173  21174 -21175 -163 -21176 0
-21173  21174 -21175 -163 -21177 0
-21173  21174 -21175 -163 -21178 0

c  0+1 --> 1
c    (-b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧  p_163) -> (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0)
c  in CNF:
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_2
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_1
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨  b^{163, 2}_0
c  in DIMACS:
 21173  21174  21175 -163 -21176 0
 21173  21174  21175 -163 -21177 0
 21173  21174  21175 -163  21178 0

c  1+1 --> 2
c    (-b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧  b^{163, 1}_0 ∧  p_163) -> (-b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0)
c  in CNF:
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_2
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨  b^{163, 2}_1
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ -p_163 ∨ -b^{163, 2}_0
c  in DIMACS:
 21173  21174 -21175 -163 -21176 0
 21173  21174 -21175 -163  21177 0
 21173  21174 -21175 -163 -21178 0

c  2+1 --> break 
c    (-b^{163, 1}_2 ∧  b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧  p_163) -> break
c  in CNF:
c     b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ -p_163 ∨ break
c  in DIMACS:
 21173 -21174  21175 -163 1162 0


c  2-1 --> 1
c    (-b^{163, 1}_2 ∧  b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧ -p_163) -> (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0)
c  in CNF:
c     b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_2
c     b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_1
c     b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨  b^{163, 2}_0
c  in DIMACS:
 21173 -21174  21175  163 -21176 0
 21173 -21174  21175  163 -21177 0
 21173 -21174  21175  163  21178 0

c  1-1 --> 0
c    (-b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧  b^{163, 1}_0 ∧ -p_163) -> (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧ -b^{163, 2}_0)
c  in CNF:
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_2
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_1
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_0
c  in DIMACS:
 21173  21174 -21175  163 -21176 0
 21173  21174 -21175  163 -21177 0
 21173  21174 -21175  163 -21178 0

c  0-1 --> -1
c    (-b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧ -p_163) -> ( b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0)
c  in CNF:
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨  b^{163, 2}_2
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_1
c     b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨  b^{163, 2}_0
c  in DIMACS:
 21173  21174  21175  163  21176 0
 21173  21174  21175  163 -21177 0
 21173  21174  21175  163  21178 0

c  -1-1 --> -2
c    ( b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧  b^{163, 1}_0 ∧ -p_163) -> ( b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0)
c  in CNF:
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨  b^{163, 2}_2
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨  b^{163, 2}_1
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨  p_163 ∨ -b^{163, 2}_0
c  in DIMACS:
-21173  21174 -21175  163  21176 0
-21173  21174 -21175  163  21177 0
-21173  21174 -21175  163 -21178 0

c  -2-1 --> break 
c    ( b^{163, 1}_2 ∧  b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧ -p_163) -> break
c  in CNF:
c    -b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨  b^{163, 1}_0 ∨  p_163 ∨ break
c  in DIMACS:
-21173 -21174  21175  163 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 1}_2 ∧ -b^{163, 1}_1 ∧ -b^{163, 1}_0 ∧ true) 
c  in CNF:
c    -b^{163, 1}_2 ∨  b^{163, 1}_1 ∨  b^{163, 1}_0 ∨ false 
c  in DIMACS:
-21173  21174  21175  0

c  3 does not represent an automaton state.
c    -(-b^{163, 1}_2 ∧  b^{163, 1}_1 ∧  b^{163, 1}_0 ∧ true) 
c  in CNF:
c     b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ false 
c  in DIMACS:
 21173 -21174 -21175  0
c  -3 does not represent an automaton state.
c    -( b^{163, 1}_2 ∧  b^{163, 1}_1 ∧  b^{163, 1}_0 ∧ true) 
c  in CNF:
c    -b^{163, 1}_2 ∨ -b^{163, 1}_1 ∨ -b^{163, 1}_0 ∨ false 
c  in DIMACS:
-21173 -21174 -21175  0

c i = 2
c  -2+1 --> -1
c    ( b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧  p_326) -> ( b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0)
c  in CNF:
c    -b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨  b^{163, 3}_2
c    -b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_1
c    -b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨  b^{163, 3}_0
c  in DIMACS:
-21176 -21177  21178 -326  21179 0
-21176 -21177  21178 -326 -21180 0
-21176 -21177  21178 -326  21181 0

c  -1+1 --> 0
c    ( b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0 ∧  p_326) -> (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧ -b^{163, 3}_0)
c  in CNF:
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_2
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_1
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_0
c  in DIMACS:
-21176  21177 -21178 -326 -21179 0
-21176  21177 -21178 -326 -21180 0
-21176  21177 -21178 -326 -21181 0

c  0+1 --> 1
c    (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧  p_326) -> (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0)
c  in CNF:
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_2
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_1
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨  b^{163, 3}_0
c  in DIMACS:
 21176  21177  21178 -326 -21179 0
 21176  21177  21178 -326 -21180 0
 21176  21177  21178 -326  21181 0

c  1+1 --> 2
c    (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0 ∧  p_326) -> (-b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0)
c  in CNF:
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_2
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨  b^{163, 3}_1
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ -p_326 ∨ -b^{163, 3}_0
c  in DIMACS:
 21176  21177 -21178 -326 -21179 0
 21176  21177 -21178 -326  21180 0
 21176  21177 -21178 -326 -21181 0

c  2+1 --> break 
c    (-b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧  p_326) -> break
c  in CNF:
c     b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ -p_326 ∨ break
c  in DIMACS:
 21176 -21177  21178 -326 1162 0


c  2-1 --> 1
c    (-b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧ -p_326) -> (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0)
c  in CNF:
c     b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_2
c     b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_1
c     b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨  b^{163, 3}_0
c  in DIMACS:
 21176 -21177  21178  326 -21179 0
 21176 -21177  21178  326 -21180 0
 21176 -21177  21178  326  21181 0

c  1-1 --> 0
c    (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0 ∧ -p_326) -> (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧ -b^{163, 3}_0)
c  in CNF:
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_2
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_1
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_0
c  in DIMACS:
 21176  21177 -21178  326 -21179 0
 21176  21177 -21178  326 -21180 0
 21176  21177 -21178  326 -21181 0

c  0-1 --> -1
c    (-b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧ -p_326) -> ( b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0)
c  in CNF:
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨  b^{163, 3}_2
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_1
c     b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨  b^{163, 3}_0
c  in DIMACS:
 21176  21177  21178  326  21179 0
 21176  21177  21178  326 -21180 0
 21176  21177  21178  326  21181 0

c  -1-1 --> -2
c    ( b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧  b^{163, 2}_0 ∧ -p_326) -> ( b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0)
c  in CNF:
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨  b^{163, 3}_2
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨  b^{163, 3}_1
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨  p_326 ∨ -b^{163, 3}_0
c  in DIMACS:
-21176  21177 -21178  326  21179 0
-21176  21177 -21178  326  21180 0
-21176  21177 -21178  326 -21181 0

c  -2-1 --> break 
c    ( b^{163, 2}_2 ∧  b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧ -p_326) -> break
c  in CNF:
c    -b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨  b^{163, 2}_0 ∨  p_326 ∨ break
c  in DIMACS:
-21176 -21177  21178  326 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 2}_2 ∧ -b^{163, 2}_1 ∧ -b^{163, 2}_0 ∧ true) 
c  in CNF:
c    -b^{163, 2}_2 ∨  b^{163, 2}_1 ∨  b^{163, 2}_0 ∨ false 
c  in DIMACS:
-21176  21177  21178  0

c  3 does not represent an automaton state.
c    -(-b^{163, 2}_2 ∧  b^{163, 2}_1 ∧  b^{163, 2}_0 ∧ true) 
c  in CNF:
c     b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ false 
c  in DIMACS:
 21176 -21177 -21178  0
c  -3 does not represent an automaton state.
c    -( b^{163, 2}_2 ∧  b^{163, 2}_1 ∧  b^{163, 2}_0 ∧ true) 
c  in CNF:
c    -b^{163, 2}_2 ∨ -b^{163, 2}_1 ∨ -b^{163, 2}_0 ∨ false 
c  in DIMACS:
-21176 -21177 -21178  0

c i = 3
c  -2+1 --> -1
c    ( b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧  p_489) -> ( b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0)
c  in CNF:
c    -b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨  b^{163, 4}_2
c    -b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_1
c    -b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨  b^{163, 4}_0
c  in DIMACS:
-21179 -21180  21181 -489  21182 0
-21179 -21180  21181 -489 -21183 0
-21179 -21180  21181 -489  21184 0

c  -1+1 --> 0
c    ( b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0 ∧  p_489) -> (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧ -b^{163, 4}_0)
c  in CNF:
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_2
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_1
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_0
c  in DIMACS:
-21179  21180 -21181 -489 -21182 0
-21179  21180 -21181 -489 -21183 0
-21179  21180 -21181 -489 -21184 0

c  0+1 --> 1
c    (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧  p_489) -> (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0)
c  in CNF:
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_2
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_1
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨  b^{163, 4}_0
c  in DIMACS:
 21179  21180  21181 -489 -21182 0
 21179  21180  21181 -489 -21183 0
 21179  21180  21181 -489  21184 0

c  1+1 --> 2
c    (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0 ∧  p_489) -> (-b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0)
c  in CNF:
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_2
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨  b^{163, 4}_1
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ -p_489 ∨ -b^{163, 4}_0
c  in DIMACS:
 21179  21180 -21181 -489 -21182 0
 21179  21180 -21181 -489  21183 0
 21179  21180 -21181 -489 -21184 0

c  2+1 --> break 
c    (-b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧  p_489) -> break
c  in CNF:
c     b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ -p_489 ∨ break
c  in DIMACS:
 21179 -21180  21181 -489 1162 0


c  2-1 --> 1
c    (-b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧ -p_489) -> (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0)
c  in CNF:
c     b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_2
c     b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_1
c     b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨  b^{163, 4}_0
c  in DIMACS:
 21179 -21180  21181  489 -21182 0
 21179 -21180  21181  489 -21183 0
 21179 -21180  21181  489  21184 0

c  1-1 --> 0
c    (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0 ∧ -p_489) -> (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧ -b^{163, 4}_0)
c  in CNF:
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_2
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_1
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_0
c  in DIMACS:
 21179  21180 -21181  489 -21182 0
 21179  21180 -21181  489 -21183 0
 21179  21180 -21181  489 -21184 0

c  0-1 --> -1
c    (-b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧ -p_489) -> ( b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0)
c  in CNF:
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨  b^{163, 4}_2
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_1
c     b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨  b^{163, 4}_0
c  in DIMACS:
 21179  21180  21181  489  21182 0
 21179  21180  21181  489 -21183 0
 21179  21180  21181  489  21184 0

c  -1-1 --> -2
c    ( b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧  b^{163, 3}_0 ∧ -p_489) -> ( b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0)
c  in CNF:
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨  b^{163, 4}_2
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨  b^{163, 4}_1
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨  p_489 ∨ -b^{163, 4}_0
c  in DIMACS:
-21179  21180 -21181  489  21182 0
-21179  21180 -21181  489  21183 0
-21179  21180 -21181  489 -21184 0

c  -2-1 --> break 
c    ( b^{163, 3}_2 ∧  b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧ -p_489) -> break
c  in CNF:
c    -b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨  b^{163, 3}_0 ∨  p_489 ∨ break
c  in DIMACS:
-21179 -21180  21181  489 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 3}_2 ∧ -b^{163, 3}_1 ∧ -b^{163, 3}_0 ∧ true) 
c  in CNF:
c    -b^{163, 3}_2 ∨  b^{163, 3}_1 ∨  b^{163, 3}_0 ∨ false 
c  in DIMACS:
-21179  21180  21181  0

c  3 does not represent an automaton state.
c    -(-b^{163, 3}_2 ∧  b^{163, 3}_1 ∧  b^{163, 3}_0 ∧ true) 
c  in CNF:
c     b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ false 
c  in DIMACS:
 21179 -21180 -21181  0
c  -3 does not represent an automaton state.
c    -( b^{163, 3}_2 ∧  b^{163, 3}_1 ∧  b^{163, 3}_0 ∧ true) 
c  in CNF:
c    -b^{163, 3}_2 ∨ -b^{163, 3}_1 ∨ -b^{163, 3}_0 ∨ false 
c  in DIMACS:
-21179 -21180 -21181  0

c i = 4
c  -2+1 --> -1
c    ( b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧  p_652) -> ( b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0)
c  in CNF:
c    -b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨  b^{163, 5}_2
c    -b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_1
c    -b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨  b^{163, 5}_0
c  in DIMACS:
-21182 -21183  21184 -652  21185 0
-21182 -21183  21184 -652 -21186 0
-21182 -21183  21184 -652  21187 0

c  -1+1 --> 0
c    ( b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0 ∧  p_652) -> (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧ -b^{163, 5}_0)
c  in CNF:
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_2
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_1
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_0
c  in DIMACS:
-21182  21183 -21184 -652 -21185 0
-21182  21183 -21184 -652 -21186 0
-21182  21183 -21184 -652 -21187 0

c  0+1 --> 1
c    (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧  p_652) -> (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0)
c  in CNF:
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_2
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_1
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨  b^{163, 5}_0
c  in DIMACS:
 21182  21183  21184 -652 -21185 0
 21182  21183  21184 -652 -21186 0
 21182  21183  21184 -652  21187 0

c  1+1 --> 2
c    (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0 ∧  p_652) -> (-b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0)
c  in CNF:
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_2
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨  b^{163, 5}_1
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ -p_652 ∨ -b^{163, 5}_0
c  in DIMACS:
 21182  21183 -21184 -652 -21185 0
 21182  21183 -21184 -652  21186 0
 21182  21183 -21184 -652 -21187 0

c  2+1 --> break 
c    (-b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧  p_652) -> break
c  in CNF:
c     b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ -p_652 ∨ break
c  in DIMACS:
 21182 -21183  21184 -652 1162 0


c  2-1 --> 1
c    (-b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧ -p_652) -> (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0)
c  in CNF:
c     b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_2
c     b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_1
c     b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨  b^{163, 5}_0
c  in DIMACS:
 21182 -21183  21184  652 -21185 0
 21182 -21183  21184  652 -21186 0
 21182 -21183  21184  652  21187 0

c  1-1 --> 0
c    (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0 ∧ -p_652) -> (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧ -b^{163, 5}_0)
c  in CNF:
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_2
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_1
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_0
c  in DIMACS:
 21182  21183 -21184  652 -21185 0
 21182  21183 -21184  652 -21186 0
 21182  21183 -21184  652 -21187 0

c  0-1 --> -1
c    (-b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧ -p_652) -> ( b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0)
c  in CNF:
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨  b^{163, 5}_2
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_1
c     b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨  b^{163, 5}_0
c  in DIMACS:
 21182  21183  21184  652  21185 0
 21182  21183  21184  652 -21186 0
 21182  21183  21184  652  21187 0

c  -1-1 --> -2
c    ( b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧  b^{163, 4}_0 ∧ -p_652) -> ( b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0)
c  in CNF:
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨  b^{163, 5}_2
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨  b^{163, 5}_1
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨  p_652 ∨ -b^{163, 5}_0
c  in DIMACS:
-21182  21183 -21184  652  21185 0
-21182  21183 -21184  652  21186 0
-21182  21183 -21184  652 -21187 0

c  -2-1 --> break 
c    ( b^{163, 4}_2 ∧  b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧ -p_652) -> break
c  in CNF:
c    -b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨  b^{163, 4}_0 ∨  p_652 ∨ break
c  in DIMACS:
-21182 -21183  21184  652 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 4}_2 ∧ -b^{163, 4}_1 ∧ -b^{163, 4}_0 ∧ true) 
c  in CNF:
c    -b^{163, 4}_2 ∨  b^{163, 4}_1 ∨  b^{163, 4}_0 ∨ false 
c  in DIMACS:
-21182  21183  21184  0

c  3 does not represent an automaton state.
c    -(-b^{163, 4}_2 ∧  b^{163, 4}_1 ∧  b^{163, 4}_0 ∧ true) 
c  in CNF:
c     b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ false 
c  in DIMACS:
 21182 -21183 -21184  0
c  -3 does not represent an automaton state.
c    -( b^{163, 4}_2 ∧  b^{163, 4}_1 ∧  b^{163, 4}_0 ∧ true) 
c  in CNF:
c    -b^{163, 4}_2 ∨ -b^{163, 4}_1 ∨ -b^{163, 4}_0 ∨ false 
c  in DIMACS:
-21182 -21183 -21184  0

c i = 5
c  -2+1 --> -1
c    ( b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧  p_815) -> ( b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0)
c  in CNF:
c    -b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨  b^{163, 6}_2
c    -b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_1
c    -b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨  b^{163, 6}_0
c  in DIMACS:
-21185 -21186  21187 -815  21188 0
-21185 -21186  21187 -815 -21189 0
-21185 -21186  21187 -815  21190 0

c  -1+1 --> 0
c    ( b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0 ∧  p_815) -> (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧ -b^{163, 6}_0)
c  in CNF:
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_2
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_1
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_0
c  in DIMACS:
-21185  21186 -21187 -815 -21188 0
-21185  21186 -21187 -815 -21189 0
-21185  21186 -21187 -815 -21190 0

c  0+1 --> 1
c    (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧  p_815) -> (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0)
c  in CNF:
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_2
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_1
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨  b^{163, 6}_0
c  in DIMACS:
 21185  21186  21187 -815 -21188 0
 21185  21186  21187 -815 -21189 0
 21185  21186  21187 -815  21190 0

c  1+1 --> 2
c    (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0 ∧  p_815) -> (-b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0)
c  in CNF:
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_2
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨  b^{163, 6}_1
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ -p_815 ∨ -b^{163, 6}_0
c  in DIMACS:
 21185  21186 -21187 -815 -21188 0
 21185  21186 -21187 -815  21189 0
 21185  21186 -21187 -815 -21190 0

c  2+1 --> break 
c    (-b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧  p_815) -> break
c  in CNF:
c     b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ -p_815 ∨ break
c  in DIMACS:
 21185 -21186  21187 -815 1162 0


c  2-1 --> 1
c    (-b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧ -p_815) -> (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0)
c  in CNF:
c     b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_2
c     b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_1
c     b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨  b^{163, 6}_0
c  in DIMACS:
 21185 -21186  21187  815 -21188 0
 21185 -21186  21187  815 -21189 0
 21185 -21186  21187  815  21190 0

c  1-1 --> 0
c    (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0 ∧ -p_815) -> (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧ -b^{163, 6}_0)
c  in CNF:
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_2
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_1
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_0
c  in DIMACS:
 21185  21186 -21187  815 -21188 0
 21185  21186 -21187  815 -21189 0
 21185  21186 -21187  815 -21190 0

c  0-1 --> -1
c    (-b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧ -p_815) -> ( b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0)
c  in CNF:
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨  b^{163, 6}_2
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_1
c     b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨  b^{163, 6}_0
c  in DIMACS:
 21185  21186  21187  815  21188 0
 21185  21186  21187  815 -21189 0
 21185  21186  21187  815  21190 0

c  -1-1 --> -2
c    ( b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧  b^{163, 5}_0 ∧ -p_815) -> ( b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0)
c  in CNF:
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨  b^{163, 6}_2
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨  b^{163, 6}_1
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨  p_815 ∨ -b^{163, 6}_0
c  in DIMACS:
-21185  21186 -21187  815  21188 0
-21185  21186 -21187  815  21189 0
-21185  21186 -21187  815 -21190 0

c  -2-1 --> break 
c    ( b^{163, 5}_2 ∧  b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧ -p_815) -> break
c  in CNF:
c    -b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨  b^{163, 5}_0 ∨  p_815 ∨ break
c  in DIMACS:
-21185 -21186  21187  815 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 5}_2 ∧ -b^{163, 5}_1 ∧ -b^{163, 5}_0 ∧ true) 
c  in CNF:
c    -b^{163, 5}_2 ∨  b^{163, 5}_1 ∨  b^{163, 5}_0 ∨ false 
c  in DIMACS:
-21185  21186  21187  0

c  3 does not represent an automaton state.
c    -(-b^{163, 5}_2 ∧  b^{163, 5}_1 ∧  b^{163, 5}_0 ∧ true) 
c  in CNF:
c     b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ false 
c  in DIMACS:
 21185 -21186 -21187  0
c  -3 does not represent an automaton state.
c    -( b^{163, 5}_2 ∧  b^{163, 5}_1 ∧  b^{163, 5}_0 ∧ true) 
c  in CNF:
c    -b^{163, 5}_2 ∨ -b^{163, 5}_1 ∨ -b^{163, 5}_0 ∨ false 
c  in DIMACS:
-21185 -21186 -21187  0

c i = 6
c  -2+1 --> -1
c    ( b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧  p_978) -> ( b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0)
c  in CNF:
c    -b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨  b^{163, 7}_2
c    -b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_1
c    -b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨  b^{163, 7}_0
c  in DIMACS:
-21188 -21189  21190 -978  21191 0
-21188 -21189  21190 -978 -21192 0
-21188 -21189  21190 -978  21193 0

c  -1+1 --> 0
c    ( b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0 ∧  p_978) -> (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧ -b^{163, 7}_0)
c  in CNF:
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_2
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_1
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_0
c  in DIMACS:
-21188  21189 -21190 -978 -21191 0
-21188  21189 -21190 -978 -21192 0
-21188  21189 -21190 -978 -21193 0

c  0+1 --> 1
c    (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧  p_978) -> (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0)
c  in CNF:
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_2
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_1
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨  b^{163, 7}_0
c  in DIMACS:
 21188  21189  21190 -978 -21191 0
 21188  21189  21190 -978 -21192 0
 21188  21189  21190 -978  21193 0

c  1+1 --> 2
c    (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0 ∧  p_978) -> (-b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0)
c  in CNF:
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_2
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨  b^{163, 7}_1
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ -p_978 ∨ -b^{163, 7}_0
c  in DIMACS:
 21188  21189 -21190 -978 -21191 0
 21188  21189 -21190 -978  21192 0
 21188  21189 -21190 -978 -21193 0

c  2+1 --> break 
c    (-b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧  p_978) -> break
c  in CNF:
c     b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 21188 -21189  21190 -978 1162 0


c  2-1 --> 1
c    (-b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧ -p_978) -> (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0)
c  in CNF:
c     b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_2
c     b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_1
c     b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨  b^{163, 7}_0
c  in DIMACS:
 21188 -21189  21190  978 -21191 0
 21188 -21189  21190  978 -21192 0
 21188 -21189  21190  978  21193 0

c  1-1 --> 0
c    (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0 ∧ -p_978) -> (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧ -b^{163, 7}_0)
c  in CNF:
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_2
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_1
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_0
c  in DIMACS:
 21188  21189 -21190  978 -21191 0
 21188  21189 -21190  978 -21192 0
 21188  21189 -21190  978 -21193 0

c  0-1 --> -1
c    (-b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧ -p_978) -> ( b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0)
c  in CNF:
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨  b^{163, 7}_2
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_1
c     b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨  b^{163, 7}_0
c  in DIMACS:
 21188  21189  21190  978  21191 0
 21188  21189  21190  978 -21192 0
 21188  21189  21190  978  21193 0

c  -1-1 --> -2
c    ( b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧  b^{163, 6}_0 ∧ -p_978) -> ( b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0)
c  in CNF:
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨  b^{163, 7}_2
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨  b^{163, 7}_1
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨  p_978 ∨ -b^{163, 7}_0
c  in DIMACS:
-21188  21189 -21190  978  21191 0
-21188  21189 -21190  978  21192 0
-21188  21189 -21190  978 -21193 0

c  -2-1 --> break 
c    ( b^{163, 6}_2 ∧  b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨  b^{163, 6}_0 ∨  p_978 ∨ break
c  in DIMACS:
-21188 -21189  21190  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 6}_2 ∧ -b^{163, 6}_1 ∧ -b^{163, 6}_0 ∧ true) 
c  in CNF:
c    -b^{163, 6}_2 ∨  b^{163, 6}_1 ∨  b^{163, 6}_0 ∨ false 
c  in DIMACS:
-21188  21189  21190  0

c  3 does not represent an automaton state.
c    -(-b^{163, 6}_2 ∧  b^{163, 6}_1 ∧  b^{163, 6}_0 ∧ true) 
c  in CNF:
c     b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ false 
c  in DIMACS:
 21188 -21189 -21190  0
c  -3 does not represent an automaton state.
c    -( b^{163, 6}_2 ∧  b^{163, 6}_1 ∧  b^{163, 6}_0 ∧ true) 
c  in CNF:
c    -b^{163, 6}_2 ∨ -b^{163, 6}_1 ∨ -b^{163, 6}_0 ∨ false 
c  in DIMACS:
-21188 -21189 -21190  0

c i = 7
c  -2+1 --> -1
c    ( b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧  p_1141) -> ( b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧  b^{163, 8}_0)
c  in CNF:
c    -b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨  b^{163, 8}_2
c    -b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_1
c    -b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨  b^{163, 8}_0
c  in DIMACS:
-21191 -21192  21193 -1141  21194 0
-21191 -21192  21193 -1141 -21195 0
-21191 -21192  21193 -1141  21196 0

c  -1+1 --> 0
c    ( b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0 ∧  p_1141) -> (-b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧ -b^{163, 8}_0)
c  in CNF:
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_2
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_1
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_0
c  in DIMACS:
-21191  21192 -21193 -1141 -21194 0
-21191  21192 -21193 -1141 -21195 0
-21191  21192 -21193 -1141 -21196 0

c  0+1 --> 1
c    (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧  p_1141) -> (-b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧  b^{163, 8}_0)
c  in CNF:
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_2
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_1
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨  b^{163, 8}_0
c  in DIMACS:
 21191  21192  21193 -1141 -21194 0
 21191  21192  21193 -1141 -21195 0
 21191  21192  21193 -1141  21196 0

c  1+1 --> 2
c    (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0 ∧  p_1141) -> (-b^{163, 8}_2 ∧  b^{163, 8}_1 ∧ -b^{163, 8}_0)
c  in CNF:
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_2
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨  b^{163, 8}_1
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ -p_1141 ∨ -b^{163, 8}_0
c  in DIMACS:
 21191  21192 -21193 -1141 -21194 0
 21191  21192 -21193 -1141  21195 0
 21191  21192 -21193 -1141 -21196 0

c  2+1 --> break 
c    (-b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧  p_1141) -> break
c  in CNF:
c     b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ -p_1141 ∨ break
c  in DIMACS:
 21191 -21192  21193 -1141 1162 0


c  2-1 --> 1
c    (-b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧ -p_1141) -> (-b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧  b^{163, 8}_0)
c  in CNF:
c     b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_2
c     b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_1
c     b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨  b^{163, 8}_0
c  in DIMACS:
 21191 -21192  21193  1141 -21194 0
 21191 -21192  21193  1141 -21195 0
 21191 -21192  21193  1141  21196 0

c  1-1 --> 0
c    (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0 ∧ -p_1141) -> (-b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧ -b^{163, 8}_0)
c  in CNF:
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_2
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_1
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_0
c  in DIMACS:
 21191  21192 -21193  1141 -21194 0
 21191  21192 -21193  1141 -21195 0
 21191  21192 -21193  1141 -21196 0

c  0-1 --> -1
c    (-b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧ -p_1141) -> ( b^{163, 8}_2 ∧ -b^{163, 8}_1 ∧  b^{163, 8}_0)
c  in CNF:
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨  b^{163, 8}_2
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_1
c     b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨  b^{163, 8}_0
c  in DIMACS:
 21191  21192  21193  1141  21194 0
 21191  21192  21193  1141 -21195 0
 21191  21192  21193  1141  21196 0

c  -1-1 --> -2
c    ( b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧  b^{163, 7}_0 ∧ -p_1141) -> ( b^{163, 8}_2 ∧  b^{163, 8}_1 ∧ -b^{163, 8}_0)
c  in CNF:
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨  b^{163, 8}_2
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨  b^{163, 8}_1
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨  p_1141 ∨ -b^{163, 8}_0
c  in DIMACS:
-21191  21192 -21193  1141  21194 0
-21191  21192 -21193  1141  21195 0
-21191  21192 -21193  1141 -21196 0

c  -2-1 --> break 
c    ( b^{163, 7}_2 ∧  b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧ -p_1141) -> break
c  in CNF:
c    -b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨  b^{163, 7}_0 ∨  p_1141 ∨ break
c  in DIMACS:
-21191 -21192  21193  1141 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{163, 7}_2 ∧ -b^{163, 7}_1 ∧ -b^{163, 7}_0 ∧ true) 
c  in CNF:
c    -b^{163, 7}_2 ∨  b^{163, 7}_1 ∨  b^{163, 7}_0 ∨ false 
c  in DIMACS:
-21191  21192  21193  0

c  3 does not represent an automaton state.
c    -(-b^{163, 7}_2 ∧  b^{163, 7}_1 ∧  b^{163, 7}_0 ∧ true) 
c  in CNF:
c     b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ false 
c  in DIMACS:
 21191 -21192 -21193  0
c  -3 does not represent an automaton state.
c    -( b^{163, 7}_2 ∧  b^{163, 7}_1 ∧  b^{163, 7}_0 ∧ true) 
c  in CNF:
c    -b^{163, 7}_2 ∨ -b^{163, 7}_1 ∨ -b^{163, 7}_0 ∨ false 
c  in DIMACS:
-21191 -21192 -21193  0

c INIT for k = 164
c    -b^{164, 1}_2
c    -b^{164, 1}_1
c    -b^{164, 1}_0
c  in DIMACS:
-21197 0
-21198 0
-21199 0

c Transitions for k = 164
c i = 1
c  -2+1 --> -1
c    ( b^{164, 1}_2 ∧  b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧  p_164) -> ( b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0)
c  in CNF:
c    -b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨  b^{164, 2}_2
c    -b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_1
c    -b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨  b^{164, 2}_0
c  in DIMACS:
-21197 -21198  21199 -164  21200 0
-21197 -21198  21199 -164 -21201 0
-21197 -21198  21199 -164  21202 0

c  -1+1 --> 0
c    ( b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧  b^{164, 1}_0 ∧  p_164) -> (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧ -b^{164, 2}_0)
c  in CNF:
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_2
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_1
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_0
c  in DIMACS:
-21197  21198 -21199 -164 -21200 0
-21197  21198 -21199 -164 -21201 0
-21197  21198 -21199 -164 -21202 0

c  0+1 --> 1
c    (-b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧  p_164) -> (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0)
c  in CNF:
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_2
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_1
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨  b^{164, 2}_0
c  in DIMACS:
 21197  21198  21199 -164 -21200 0
 21197  21198  21199 -164 -21201 0
 21197  21198  21199 -164  21202 0

c  1+1 --> 2
c    (-b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧  b^{164, 1}_0 ∧  p_164) -> (-b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0)
c  in CNF:
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_2
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨  b^{164, 2}_1
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ -p_164 ∨ -b^{164, 2}_0
c  in DIMACS:
 21197  21198 -21199 -164 -21200 0
 21197  21198 -21199 -164  21201 0
 21197  21198 -21199 -164 -21202 0

c  2+1 --> break 
c    (-b^{164, 1}_2 ∧  b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧  p_164) -> break
c  in CNF:
c     b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ -p_164 ∨ break
c  in DIMACS:
 21197 -21198  21199 -164 1162 0


c  2-1 --> 1
c    (-b^{164, 1}_2 ∧  b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧ -p_164) -> (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0)
c  in CNF:
c     b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_2
c     b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_1
c     b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨  b^{164, 2}_0
c  in DIMACS:
 21197 -21198  21199  164 -21200 0
 21197 -21198  21199  164 -21201 0
 21197 -21198  21199  164  21202 0

c  1-1 --> 0
c    (-b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧  b^{164, 1}_0 ∧ -p_164) -> (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧ -b^{164, 2}_0)
c  in CNF:
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_2
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_1
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_0
c  in DIMACS:
 21197  21198 -21199  164 -21200 0
 21197  21198 -21199  164 -21201 0
 21197  21198 -21199  164 -21202 0

c  0-1 --> -1
c    (-b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧ -p_164) -> ( b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0)
c  in CNF:
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨  b^{164, 2}_2
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_1
c     b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨  b^{164, 2}_0
c  in DIMACS:
 21197  21198  21199  164  21200 0
 21197  21198  21199  164 -21201 0
 21197  21198  21199  164  21202 0

c  -1-1 --> -2
c    ( b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧  b^{164, 1}_0 ∧ -p_164) -> ( b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0)
c  in CNF:
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨  b^{164, 2}_2
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨  b^{164, 2}_1
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨  p_164 ∨ -b^{164, 2}_0
c  in DIMACS:
-21197  21198 -21199  164  21200 0
-21197  21198 -21199  164  21201 0
-21197  21198 -21199  164 -21202 0

c  -2-1 --> break 
c    ( b^{164, 1}_2 ∧  b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧ -p_164) -> break
c  in CNF:
c    -b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨  b^{164, 1}_0 ∨  p_164 ∨ break
c  in DIMACS:
-21197 -21198  21199  164 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 1}_2 ∧ -b^{164, 1}_1 ∧ -b^{164, 1}_0 ∧ true) 
c  in CNF:
c    -b^{164, 1}_2 ∨  b^{164, 1}_1 ∨  b^{164, 1}_0 ∨ false 
c  in DIMACS:
-21197  21198  21199  0

c  3 does not represent an automaton state.
c    -(-b^{164, 1}_2 ∧  b^{164, 1}_1 ∧  b^{164, 1}_0 ∧ true) 
c  in CNF:
c     b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ false 
c  in DIMACS:
 21197 -21198 -21199  0
c  -3 does not represent an automaton state.
c    -( b^{164, 1}_2 ∧  b^{164, 1}_1 ∧  b^{164, 1}_0 ∧ true) 
c  in CNF:
c    -b^{164, 1}_2 ∨ -b^{164, 1}_1 ∨ -b^{164, 1}_0 ∨ false 
c  in DIMACS:
-21197 -21198 -21199  0

c i = 2
c  -2+1 --> -1
c    ( b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧  p_328) -> ( b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0)
c  in CNF:
c    -b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨  b^{164, 3}_2
c    -b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_1
c    -b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨  b^{164, 3}_0
c  in DIMACS:
-21200 -21201  21202 -328  21203 0
-21200 -21201  21202 -328 -21204 0
-21200 -21201  21202 -328  21205 0

c  -1+1 --> 0
c    ( b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0 ∧  p_328) -> (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧ -b^{164, 3}_0)
c  in CNF:
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_2
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_1
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_0
c  in DIMACS:
-21200  21201 -21202 -328 -21203 0
-21200  21201 -21202 -328 -21204 0
-21200  21201 -21202 -328 -21205 0

c  0+1 --> 1
c    (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧  p_328) -> (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0)
c  in CNF:
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_2
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_1
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨  b^{164, 3}_0
c  in DIMACS:
 21200  21201  21202 -328 -21203 0
 21200  21201  21202 -328 -21204 0
 21200  21201  21202 -328  21205 0

c  1+1 --> 2
c    (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0 ∧  p_328) -> (-b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0)
c  in CNF:
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_2
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨  b^{164, 3}_1
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ -p_328 ∨ -b^{164, 3}_0
c  in DIMACS:
 21200  21201 -21202 -328 -21203 0
 21200  21201 -21202 -328  21204 0
 21200  21201 -21202 -328 -21205 0

c  2+1 --> break 
c    (-b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧  p_328) -> break
c  in CNF:
c     b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 21200 -21201  21202 -328 1162 0


c  2-1 --> 1
c    (-b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧ -p_328) -> (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0)
c  in CNF:
c     b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_2
c     b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_1
c     b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨  b^{164, 3}_0
c  in DIMACS:
 21200 -21201  21202  328 -21203 0
 21200 -21201  21202  328 -21204 0
 21200 -21201  21202  328  21205 0

c  1-1 --> 0
c    (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0 ∧ -p_328) -> (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧ -b^{164, 3}_0)
c  in CNF:
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_2
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_1
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_0
c  in DIMACS:
 21200  21201 -21202  328 -21203 0
 21200  21201 -21202  328 -21204 0
 21200  21201 -21202  328 -21205 0

c  0-1 --> -1
c    (-b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧ -p_328) -> ( b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0)
c  in CNF:
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨  b^{164, 3}_2
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_1
c     b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨  b^{164, 3}_0
c  in DIMACS:
 21200  21201  21202  328  21203 0
 21200  21201  21202  328 -21204 0
 21200  21201  21202  328  21205 0

c  -1-1 --> -2
c    ( b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧  b^{164, 2}_0 ∧ -p_328) -> ( b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0)
c  in CNF:
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨  b^{164, 3}_2
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨  b^{164, 3}_1
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨  p_328 ∨ -b^{164, 3}_0
c  in DIMACS:
-21200  21201 -21202  328  21203 0
-21200  21201 -21202  328  21204 0
-21200  21201 -21202  328 -21205 0

c  -2-1 --> break 
c    ( b^{164, 2}_2 ∧  b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨  b^{164, 2}_0 ∨  p_328 ∨ break
c  in DIMACS:
-21200 -21201  21202  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 2}_2 ∧ -b^{164, 2}_1 ∧ -b^{164, 2}_0 ∧ true) 
c  in CNF:
c    -b^{164, 2}_2 ∨  b^{164, 2}_1 ∨  b^{164, 2}_0 ∨ false 
c  in DIMACS:
-21200  21201  21202  0

c  3 does not represent an automaton state.
c    -(-b^{164, 2}_2 ∧  b^{164, 2}_1 ∧  b^{164, 2}_0 ∧ true) 
c  in CNF:
c     b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ false 
c  in DIMACS:
 21200 -21201 -21202  0
c  -3 does not represent an automaton state.
c    -( b^{164, 2}_2 ∧  b^{164, 2}_1 ∧  b^{164, 2}_0 ∧ true) 
c  in CNF:
c    -b^{164, 2}_2 ∨ -b^{164, 2}_1 ∨ -b^{164, 2}_0 ∨ false 
c  in DIMACS:
-21200 -21201 -21202  0

c i = 3
c  -2+1 --> -1
c    ( b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧  p_492) -> ( b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0)
c  in CNF:
c    -b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨  b^{164, 4}_2
c    -b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_1
c    -b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨  b^{164, 4}_0
c  in DIMACS:
-21203 -21204  21205 -492  21206 0
-21203 -21204  21205 -492 -21207 0
-21203 -21204  21205 -492  21208 0

c  -1+1 --> 0
c    ( b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0 ∧  p_492) -> (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧ -b^{164, 4}_0)
c  in CNF:
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_2
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_1
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_0
c  in DIMACS:
-21203  21204 -21205 -492 -21206 0
-21203  21204 -21205 -492 -21207 0
-21203  21204 -21205 -492 -21208 0

c  0+1 --> 1
c    (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧  p_492) -> (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0)
c  in CNF:
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_2
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_1
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨  b^{164, 4}_0
c  in DIMACS:
 21203  21204  21205 -492 -21206 0
 21203  21204  21205 -492 -21207 0
 21203  21204  21205 -492  21208 0

c  1+1 --> 2
c    (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0 ∧  p_492) -> (-b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0)
c  in CNF:
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_2
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨  b^{164, 4}_1
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ -p_492 ∨ -b^{164, 4}_0
c  in DIMACS:
 21203  21204 -21205 -492 -21206 0
 21203  21204 -21205 -492  21207 0
 21203  21204 -21205 -492 -21208 0

c  2+1 --> break 
c    (-b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧  p_492) -> break
c  in CNF:
c     b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 21203 -21204  21205 -492 1162 0


c  2-1 --> 1
c    (-b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧ -p_492) -> (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0)
c  in CNF:
c     b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_2
c     b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_1
c     b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨  b^{164, 4}_0
c  in DIMACS:
 21203 -21204  21205  492 -21206 0
 21203 -21204  21205  492 -21207 0
 21203 -21204  21205  492  21208 0

c  1-1 --> 0
c    (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0 ∧ -p_492) -> (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧ -b^{164, 4}_0)
c  in CNF:
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_2
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_1
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_0
c  in DIMACS:
 21203  21204 -21205  492 -21206 0
 21203  21204 -21205  492 -21207 0
 21203  21204 -21205  492 -21208 0

c  0-1 --> -1
c    (-b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧ -p_492) -> ( b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0)
c  in CNF:
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨  b^{164, 4}_2
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_1
c     b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨  b^{164, 4}_0
c  in DIMACS:
 21203  21204  21205  492  21206 0
 21203  21204  21205  492 -21207 0
 21203  21204  21205  492  21208 0

c  -1-1 --> -2
c    ( b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧  b^{164, 3}_0 ∧ -p_492) -> ( b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0)
c  in CNF:
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨  b^{164, 4}_2
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨  b^{164, 4}_1
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨  p_492 ∨ -b^{164, 4}_0
c  in DIMACS:
-21203  21204 -21205  492  21206 0
-21203  21204 -21205  492  21207 0
-21203  21204 -21205  492 -21208 0

c  -2-1 --> break 
c    ( b^{164, 3}_2 ∧  b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨  b^{164, 3}_0 ∨  p_492 ∨ break
c  in DIMACS:
-21203 -21204  21205  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 3}_2 ∧ -b^{164, 3}_1 ∧ -b^{164, 3}_0 ∧ true) 
c  in CNF:
c    -b^{164, 3}_2 ∨  b^{164, 3}_1 ∨  b^{164, 3}_0 ∨ false 
c  in DIMACS:
-21203  21204  21205  0

c  3 does not represent an automaton state.
c    -(-b^{164, 3}_2 ∧  b^{164, 3}_1 ∧  b^{164, 3}_0 ∧ true) 
c  in CNF:
c     b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ false 
c  in DIMACS:
 21203 -21204 -21205  0
c  -3 does not represent an automaton state.
c    -( b^{164, 3}_2 ∧  b^{164, 3}_1 ∧  b^{164, 3}_0 ∧ true) 
c  in CNF:
c    -b^{164, 3}_2 ∨ -b^{164, 3}_1 ∨ -b^{164, 3}_0 ∨ false 
c  in DIMACS:
-21203 -21204 -21205  0

c i = 4
c  -2+1 --> -1
c    ( b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧  p_656) -> ( b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0)
c  in CNF:
c    -b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨  b^{164, 5}_2
c    -b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_1
c    -b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨  b^{164, 5}_0
c  in DIMACS:
-21206 -21207  21208 -656  21209 0
-21206 -21207  21208 -656 -21210 0
-21206 -21207  21208 -656  21211 0

c  -1+1 --> 0
c    ( b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0 ∧  p_656) -> (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧ -b^{164, 5}_0)
c  in CNF:
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_2
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_1
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_0
c  in DIMACS:
-21206  21207 -21208 -656 -21209 0
-21206  21207 -21208 -656 -21210 0
-21206  21207 -21208 -656 -21211 0

c  0+1 --> 1
c    (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧  p_656) -> (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0)
c  in CNF:
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_2
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_1
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨  b^{164, 5}_0
c  in DIMACS:
 21206  21207  21208 -656 -21209 0
 21206  21207  21208 -656 -21210 0
 21206  21207  21208 -656  21211 0

c  1+1 --> 2
c    (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0 ∧  p_656) -> (-b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0)
c  in CNF:
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_2
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨  b^{164, 5}_1
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ -p_656 ∨ -b^{164, 5}_0
c  in DIMACS:
 21206  21207 -21208 -656 -21209 0
 21206  21207 -21208 -656  21210 0
 21206  21207 -21208 -656 -21211 0

c  2+1 --> break 
c    (-b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧  p_656) -> break
c  in CNF:
c     b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 21206 -21207  21208 -656 1162 0


c  2-1 --> 1
c    (-b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧ -p_656) -> (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0)
c  in CNF:
c     b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_2
c     b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_1
c     b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨  b^{164, 5}_0
c  in DIMACS:
 21206 -21207  21208  656 -21209 0
 21206 -21207  21208  656 -21210 0
 21206 -21207  21208  656  21211 0

c  1-1 --> 0
c    (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0 ∧ -p_656) -> (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧ -b^{164, 5}_0)
c  in CNF:
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_2
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_1
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_0
c  in DIMACS:
 21206  21207 -21208  656 -21209 0
 21206  21207 -21208  656 -21210 0
 21206  21207 -21208  656 -21211 0

c  0-1 --> -1
c    (-b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧ -p_656) -> ( b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0)
c  in CNF:
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨  b^{164, 5}_2
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_1
c     b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨  b^{164, 5}_0
c  in DIMACS:
 21206  21207  21208  656  21209 0
 21206  21207  21208  656 -21210 0
 21206  21207  21208  656  21211 0

c  -1-1 --> -2
c    ( b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧  b^{164, 4}_0 ∧ -p_656) -> ( b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0)
c  in CNF:
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨  b^{164, 5}_2
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨  b^{164, 5}_1
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨  p_656 ∨ -b^{164, 5}_0
c  in DIMACS:
-21206  21207 -21208  656  21209 0
-21206  21207 -21208  656  21210 0
-21206  21207 -21208  656 -21211 0

c  -2-1 --> break 
c    ( b^{164, 4}_2 ∧  b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨  b^{164, 4}_0 ∨  p_656 ∨ break
c  in DIMACS:
-21206 -21207  21208  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 4}_2 ∧ -b^{164, 4}_1 ∧ -b^{164, 4}_0 ∧ true) 
c  in CNF:
c    -b^{164, 4}_2 ∨  b^{164, 4}_1 ∨  b^{164, 4}_0 ∨ false 
c  in DIMACS:
-21206  21207  21208  0

c  3 does not represent an automaton state.
c    -(-b^{164, 4}_2 ∧  b^{164, 4}_1 ∧  b^{164, 4}_0 ∧ true) 
c  in CNF:
c     b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ false 
c  in DIMACS:
 21206 -21207 -21208  0
c  -3 does not represent an automaton state.
c    -( b^{164, 4}_2 ∧  b^{164, 4}_1 ∧  b^{164, 4}_0 ∧ true) 
c  in CNF:
c    -b^{164, 4}_2 ∨ -b^{164, 4}_1 ∨ -b^{164, 4}_0 ∨ false 
c  in DIMACS:
-21206 -21207 -21208  0

c i = 5
c  -2+1 --> -1
c    ( b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧  p_820) -> ( b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0)
c  in CNF:
c    -b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨  b^{164, 6}_2
c    -b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_1
c    -b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨  b^{164, 6}_0
c  in DIMACS:
-21209 -21210  21211 -820  21212 0
-21209 -21210  21211 -820 -21213 0
-21209 -21210  21211 -820  21214 0

c  -1+1 --> 0
c    ( b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0 ∧  p_820) -> (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧ -b^{164, 6}_0)
c  in CNF:
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_2
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_1
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_0
c  in DIMACS:
-21209  21210 -21211 -820 -21212 0
-21209  21210 -21211 -820 -21213 0
-21209  21210 -21211 -820 -21214 0

c  0+1 --> 1
c    (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧  p_820) -> (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0)
c  in CNF:
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_2
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_1
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨  b^{164, 6}_0
c  in DIMACS:
 21209  21210  21211 -820 -21212 0
 21209  21210  21211 -820 -21213 0
 21209  21210  21211 -820  21214 0

c  1+1 --> 2
c    (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0 ∧  p_820) -> (-b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0)
c  in CNF:
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_2
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨  b^{164, 6}_1
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ -p_820 ∨ -b^{164, 6}_0
c  in DIMACS:
 21209  21210 -21211 -820 -21212 0
 21209  21210 -21211 -820  21213 0
 21209  21210 -21211 -820 -21214 0

c  2+1 --> break 
c    (-b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧  p_820) -> break
c  in CNF:
c     b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 21209 -21210  21211 -820 1162 0


c  2-1 --> 1
c    (-b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧ -p_820) -> (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0)
c  in CNF:
c     b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_2
c     b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_1
c     b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨  b^{164, 6}_0
c  in DIMACS:
 21209 -21210  21211  820 -21212 0
 21209 -21210  21211  820 -21213 0
 21209 -21210  21211  820  21214 0

c  1-1 --> 0
c    (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0 ∧ -p_820) -> (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧ -b^{164, 6}_0)
c  in CNF:
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_2
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_1
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_0
c  in DIMACS:
 21209  21210 -21211  820 -21212 0
 21209  21210 -21211  820 -21213 0
 21209  21210 -21211  820 -21214 0

c  0-1 --> -1
c    (-b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧ -p_820) -> ( b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0)
c  in CNF:
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨  b^{164, 6}_2
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_1
c     b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨  b^{164, 6}_0
c  in DIMACS:
 21209  21210  21211  820  21212 0
 21209  21210  21211  820 -21213 0
 21209  21210  21211  820  21214 0

c  -1-1 --> -2
c    ( b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧  b^{164, 5}_0 ∧ -p_820) -> ( b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0)
c  in CNF:
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨  b^{164, 6}_2
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨  b^{164, 6}_1
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨  p_820 ∨ -b^{164, 6}_0
c  in DIMACS:
-21209  21210 -21211  820  21212 0
-21209  21210 -21211  820  21213 0
-21209  21210 -21211  820 -21214 0

c  -2-1 --> break 
c    ( b^{164, 5}_2 ∧  b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨  b^{164, 5}_0 ∨  p_820 ∨ break
c  in DIMACS:
-21209 -21210  21211  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 5}_2 ∧ -b^{164, 5}_1 ∧ -b^{164, 5}_0 ∧ true) 
c  in CNF:
c    -b^{164, 5}_2 ∨  b^{164, 5}_1 ∨  b^{164, 5}_0 ∨ false 
c  in DIMACS:
-21209  21210  21211  0

c  3 does not represent an automaton state.
c    -(-b^{164, 5}_2 ∧  b^{164, 5}_1 ∧  b^{164, 5}_0 ∧ true) 
c  in CNF:
c     b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ false 
c  in DIMACS:
 21209 -21210 -21211  0
c  -3 does not represent an automaton state.
c    -( b^{164, 5}_2 ∧  b^{164, 5}_1 ∧  b^{164, 5}_0 ∧ true) 
c  in CNF:
c    -b^{164, 5}_2 ∨ -b^{164, 5}_1 ∨ -b^{164, 5}_0 ∨ false 
c  in DIMACS:
-21209 -21210 -21211  0

c i = 6
c  -2+1 --> -1
c    ( b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧  p_984) -> ( b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0)
c  in CNF:
c    -b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨  b^{164, 7}_2
c    -b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_1
c    -b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨  b^{164, 7}_0
c  in DIMACS:
-21212 -21213  21214 -984  21215 0
-21212 -21213  21214 -984 -21216 0
-21212 -21213  21214 -984  21217 0

c  -1+1 --> 0
c    ( b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0 ∧  p_984) -> (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧ -b^{164, 7}_0)
c  in CNF:
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_2
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_1
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_0
c  in DIMACS:
-21212  21213 -21214 -984 -21215 0
-21212  21213 -21214 -984 -21216 0
-21212  21213 -21214 -984 -21217 0

c  0+1 --> 1
c    (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧  p_984) -> (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0)
c  in CNF:
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_2
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_1
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨  b^{164, 7}_0
c  in DIMACS:
 21212  21213  21214 -984 -21215 0
 21212  21213  21214 -984 -21216 0
 21212  21213  21214 -984  21217 0

c  1+1 --> 2
c    (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0 ∧  p_984) -> (-b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0)
c  in CNF:
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_2
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨  b^{164, 7}_1
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ -p_984 ∨ -b^{164, 7}_0
c  in DIMACS:
 21212  21213 -21214 -984 -21215 0
 21212  21213 -21214 -984  21216 0
 21212  21213 -21214 -984 -21217 0

c  2+1 --> break 
c    (-b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧  p_984) -> break
c  in CNF:
c     b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 21212 -21213  21214 -984 1162 0


c  2-1 --> 1
c    (-b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧ -p_984) -> (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0)
c  in CNF:
c     b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_2
c     b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_1
c     b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨  b^{164, 7}_0
c  in DIMACS:
 21212 -21213  21214  984 -21215 0
 21212 -21213  21214  984 -21216 0
 21212 -21213  21214  984  21217 0

c  1-1 --> 0
c    (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0 ∧ -p_984) -> (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧ -b^{164, 7}_0)
c  in CNF:
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_2
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_1
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_0
c  in DIMACS:
 21212  21213 -21214  984 -21215 0
 21212  21213 -21214  984 -21216 0
 21212  21213 -21214  984 -21217 0

c  0-1 --> -1
c    (-b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧ -p_984) -> ( b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0)
c  in CNF:
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨  b^{164, 7}_2
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_1
c     b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨  b^{164, 7}_0
c  in DIMACS:
 21212  21213  21214  984  21215 0
 21212  21213  21214  984 -21216 0
 21212  21213  21214  984  21217 0

c  -1-1 --> -2
c    ( b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧  b^{164, 6}_0 ∧ -p_984) -> ( b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0)
c  in CNF:
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨  b^{164, 7}_2
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨  b^{164, 7}_1
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨  p_984 ∨ -b^{164, 7}_0
c  in DIMACS:
-21212  21213 -21214  984  21215 0
-21212  21213 -21214  984  21216 0
-21212  21213 -21214  984 -21217 0

c  -2-1 --> break 
c    ( b^{164, 6}_2 ∧  b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨  b^{164, 6}_0 ∨  p_984 ∨ break
c  in DIMACS:
-21212 -21213  21214  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 6}_2 ∧ -b^{164, 6}_1 ∧ -b^{164, 6}_0 ∧ true) 
c  in CNF:
c    -b^{164, 6}_2 ∨  b^{164, 6}_1 ∨  b^{164, 6}_0 ∨ false 
c  in DIMACS:
-21212  21213  21214  0

c  3 does not represent an automaton state.
c    -(-b^{164, 6}_2 ∧  b^{164, 6}_1 ∧  b^{164, 6}_0 ∧ true) 
c  in CNF:
c     b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ false 
c  in DIMACS:
 21212 -21213 -21214  0
c  -3 does not represent an automaton state.
c    -( b^{164, 6}_2 ∧  b^{164, 6}_1 ∧  b^{164, 6}_0 ∧ true) 
c  in CNF:
c    -b^{164, 6}_2 ∨ -b^{164, 6}_1 ∨ -b^{164, 6}_0 ∨ false 
c  in DIMACS:
-21212 -21213 -21214  0

c i = 7
c  -2+1 --> -1
c    ( b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧  p_1148) -> ( b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧  b^{164, 8}_0)
c  in CNF:
c    -b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨  b^{164, 8}_2
c    -b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_1
c    -b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨  b^{164, 8}_0
c  in DIMACS:
-21215 -21216  21217 -1148  21218 0
-21215 -21216  21217 -1148 -21219 0
-21215 -21216  21217 -1148  21220 0

c  -1+1 --> 0
c    ( b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0 ∧  p_1148) -> (-b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧ -b^{164, 8}_0)
c  in CNF:
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_2
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_1
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_0
c  in DIMACS:
-21215  21216 -21217 -1148 -21218 0
-21215  21216 -21217 -1148 -21219 0
-21215  21216 -21217 -1148 -21220 0

c  0+1 --> 1
c    (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧  p_1148) -> (-b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧  b^{164, 8}_0)
c  in CNF:
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_2
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_1
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨  b^{164, 8}_0
c  in DIMACS:
 21215  21216  21217 -1148 -21218 0
 21215  21216  21217 -1148 -21219 0
 21215  21216  21217 -1148  21220 0

c  1+1 --> 2
c    (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0 ∧  p_1148) -> (-b^{164, 8}_2 ∧  b^{164, 8}_1 ∧ -b^{164, 8}_0)
c  in CNF:
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_2
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨  b^{164, 8}_1
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ -p_1148 ∨ -b^{164, 8}_0
c  in DIMACS:
 21215  21216 -21217 -1148 -21218 0
 21215  21216 -21217 -1148  21219 0
 21215  21216 -21217 -1148 -21220 0

c  2+1 --> break 
c    (-b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 21215 -21216  21217 -1148 1162 0


c  2-1 --> 1
c    (-b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧ -p_1148) -> (-b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧  b^{164, 8}_0)
c  in CNF:
c     b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_2
c     b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_1
c     b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨  b^{164, 8}_0
c  in DIMACS:
 21215 -21216  21217  1148 -21218 0
 21215 -21216  21217  1148 -21219 0
 21215 -21216  21217  1148  21220 0

c  1-1 --> 0
c    (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0 ∧ -p_1148) -> (-b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧ -b^{164, 8}_0)
c  in CNF:
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_2
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_1
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_0
c  in DIMACS:
 21215  21216 -21217  1148 -21218 0
 21215  21216 -21217  1148 -21219 0
 21215  21216 -21217  1148 -21220 0

c  0-1 --> -1
c    (-b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧ -p_1148) -> ( b^{164, 8}_2 ∧ -b^{164, 8}_1 ∧  b^{164, 8}_0)
c  in CNF:
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨  b^{164, 8}_2
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_1
c     b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨  b^{164, 8}_0
c  in DIMACS:
 21215  21216  21217  1148  21218 0
 21215  21216  21217  1148 -21219 0
 21215  21216  21217  1148  21220 0

c  -1-1 --> -2
c    ( b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧  b^{164, 7}_0 ∧ -p_1148) -> ( b^{164, 8}_2 ∧  b^{164, 8}_1 ∧ -b^{164, 8}_0)
c  in CNF:
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨  b^{164, 8}_2
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨  b^{164, 8}_1
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨  p_1148 ∨ -b^{164, 8}_0
c  in DIMACS:
-21215  21216 -21217  1148  21218 0
-21215  21216 -21217  1148  21219 0
-21215  21216 -21217  1148 -21220 0

c  -2-1 --> break 
c    ( b^{164, 7}_2 ∧  b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨  b^{164, 7}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-21215 -21216  21217  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{164, 7}_2 ∧ -b^{164, 7}_1 ∧ -b^{164, 7}_0 ∧ true) 
c  in CNF:
c    -b^{164, 7}_2 ∨  b^{164, 7}_1 ∨  b^{164, 7}_0 ∨ false 
c  in DIMACS:
-21215  21216  21217  0

c  3 does not represent an automaton state.
c    -(-b^{164, 7}_2 ∧  b^{164, 7}_1 ∧  b^{164, 7}_0 ∧ true) 
c  in CNF:
c     b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ false 
c  in DIMACS:
 21215 -21216 -21217  0
c  -3 does not represent an automaton state.
c    -( b^{164, 7}_2 ∧  b^{164, 7}_1 ∧  b^{164, 7}_0 ∧ true) 
c  in CNF:
c    -b^{164, 7}_2 ∨ -b^{164, 7}_1 ∨ -b^{164, 7}_0 ∨ false 
c  in DIMACS:
-21215 -21216 -21217  0

c INIT for k = 165
c    -b^{165, 1}_2
c    -b^{165, 1}_1
c    -b^{165, 1}_0
c  in DIMACS:
-21221 0
-21222 0
-21223 0

c Transitions for k = 165
c i = 1
c  -2+1 --> -1
c    ( b^{165, 1}_2 ∧  b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧  p_165) -> ( b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0)
c  in CNF:
c    -b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨  b^{165, 2}_2
c    -b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_1
c    -b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨  b^{165, 2}_0
c  in DIMACS:
-21221 -21222  21223 -165  21224 0
-21221 -21222  21223 -165 -21225 0
-21221 -21222  21223 -165  21226 0

c  -1+1 --> 0
c    ( b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧  b^{165, 1}_0 ∧  p_165) -> (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧ -b^{165, 2}_0)
c  in CNF:
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_2
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_1
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_0
c  in DIMACS:
-21221  21222 -21223 -165 -21224 0
-21221  21222 -21223 -165 -21225 0
-21221  21222 -21223 -165 -21226 0

c  0+1 --> 1
c    (-b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧  p_165) -> (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0)
c  in CNF:
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_2
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_1
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨  b^{165, 2}_0
c  in DIMACS:
 21221  21222  21223 -165 -21224 0
 21221  21222  21223 -165 -21225 0
 21221  21222  21223 -165  21226 0

c  1+1 --> 2
c    (-b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧  b^{165, 1}_0 ∧  p_165) -> (-b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0)
c  in CNF:
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_2
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨  b^{165, 2}_1
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ -p_165 ∨ -b^{165, 2}_0
c  in DIMACS:
 21221  21222 -21223 -165 -21224 0
 21221  21222 -21223 -165  21225 0
 21221  21222 -21223 -165 -21226 0

c  2+1 --> break 
c    (-b^{165, 1}_2 ∧  b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧  p_165) -> break
c  in CNF:
c     b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ -p_165 ∨ break
c  in DIMACS:
 21221 -21222  21223 -165 1162 0


c  2-1 --> 1
c    (-b^{165, 1}_2 ∧  b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧ -p_165) -> (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0)
c  in CNF:
c     b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_2
c     b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_1
c     b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨  b^{165, 2}_0
c  in DIMACS:
 21221 -21222  21223  165 -21224 0
 21221 -21222  21223  165 -21225 0
 21221 -21222  21223  165  21226 0

c  1-1 --> 0
c    (-b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧  b^{165, 1}_0 ∧ -p_165) -> (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧ -b^{165, 2}_0)
c  in CNF:
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_2
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_1
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_0
c  in DIMACS:
 21221  21222 -21223  165 -21224 0
 21221  21222 -21223  165 -21225 0
 21221  21222 -21223  165 -21226 0

c  0-1 --> -1
c    (-b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧ -p_165) -> ( b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0)
c  in CNF:
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨  b^{165, 2}_2
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_1
c     b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨  b^{165, 2}_0
c  in DIMACS:
 21221  21222  21223  165  21224 0
 21221  21222  21223  165 -21225 0
 21221  21222  21223  165  21226 0

c  -1-1 --> -2
c    ( b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧  b^{165, 1}_0 ∧ -p_165) -> ( b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0)
c  in CNF:
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨  b^{165, 2}_2
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨  b^{165, 2}_1
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨  p_165 ∨ -b^{165, 2}_0
c  in DIMACS:
-21221  21222 -21223  165  21224 0
-21221  21222 -21223  165  21225 0
-21221  21222 -21223  165 -21226 0

c  -2-1 --> break 
c    ( b^{165, 1}_2 ∧  b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧ -p_165) -> break
c  in CNF:
c    -b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨  b^{165, 1}_0 ∨  p_165 ∨ break
c  in DIMACS:
-21221 -21222  21223  165 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 1}_2 ∧ -b^{165, 1}_1 ∧ -b^{165, 1}_0 ∧ true) 
c  in CNF:
c    -b^{165, 1}_2 ∨  b^{165, 1}_1 ∨  b^{165, 1}_0 ∨ false 
c  in DIMACS:
-21221  21222  21223  0

c  3 does not represent an automaton state.
c    -(-b^{165, 1}_2 ∧  b^{165, 1}_1 ∧  b^{165, 1}_0 ∧ true) 
c  in CNF:
c     b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ false 
c  in DIMACS:
 21221 -21222 -21223  0
c  -3 does not represent an automaton state.
c    -( b^{165, 1}_2 ∧  b^{165, 1}_1 ∧  b^{165, 1}_0 ∧ true) 
c  in CNF:
c    -b^{165, 1}_2 ∨ -b^{165, 1}_1 ∨ -b^{165, 1}_0 ∨ false 
c  in DIMACS:
-21221 -21222 -21223  0

c i = 2
c  -2+1 --> -1
c    ( b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧  p_330) -> ( b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0)
c  in CNF:
c    -b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨  b^{165, 3}_2
c    -b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_1
c    -b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨  b^{165, 3}_0
c  in DIMACS:
-21224 -21225  21226 -330  21227 0
-21224 -21225  21226 -330 -21228 0
-21224 -21225  21226 -330  21229 0

c  -1+1 --> 0
c    ( b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0 ∧  p_330) -> (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧ -b^{165, 3}_0)
c  in CNF:
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_2
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_1
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_0
c  in DIMACS:
-21224  21225 -21226 -330 -21227 0
-21224  21225 -21226 -330 -21228 0
-21224  21225 -21226 -330 -21229 0

c  0+1 --> 1
c    (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧  p_330) -> (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0)
c  in CNF:
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_2
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_1
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨  b^{165, 3}_0
c  in DIMACS:
 21224  21225  21226 -330 -21227 0
 21224  21225  21226 -330 -21228 0
 21224  21225  21226 -330  21229 0

c  1+1 --> 2
c    (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0 ∧  p_330) -> (-b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0)
c  in CNF:
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_2
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨  b^{165, 3}_1
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ -p_330 ∨ -b^{165, 3}_0
c  in DIMACS:
 21224  21225 -21226 -330 -21227 0
 21224  21225 -21226 -330  21228 0
 21224  21225 -21226 -330 -21229 0

c  2+1 --> break 
c    (-b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧  p_330) -> break
c  in CNF:
c     b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 21224 -21225  21226 -330 1162 0


c  2-1 --> 1
c    (-b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧ -p_330) -> (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0)
c  in CNF:
c     b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_2
c     b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_1
c     b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨  b^{165, 3}_0
c  in DIMACS:
 21224 -21225  21226  330 -21227 0
 21224 -21225  21226  330 -21228 0
 21224 -21225  21226  330  21229 0

c  1-1 --> 0
c    (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0 ∧ -p_330) -> (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧ -b^{165, 3}_0)
c  in CNF:
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_2
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_1
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_0
c  in DIMACS:
 21224  21225 -21226  330 -21227 0
 21224  21225 -21226  330 -21228 0
 21224  21225 -21226  330 -21229 0

c  0-1 --> -1
c    (-b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧ -p_330) -> ( b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0)
c  in CNF:
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨  b^{165, 3}_2
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_1
c     b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨  b^{165, 3}_0
c  in DIMACS:
 21224  21225  21226  330  21227 0
 21224  21225  21226  330 -21228 0
 21224  21225  21226  330  21229 0

c  -1-1 --> -2
c    ( b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧  b^{165, 2}_0 ∧ -p_330) -> ( b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0)
c  in CNF:
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨  b^{165, 3}_2
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨  b^{165, 3}_1
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨  p_330 ∨ -b^{165, 3}_0
c  in DIMACS:
-21224  21225 -21226  330  21227 0
-21224  21225 -21226  330  21228 0
-21224  21225 -21226  330 -21229 0

c  -2-1 --> break 
c    ( b^{165, 2}_2 ∧  b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨  b^{165, 2}_0 ∨  p_330 ∨ break
c  in DIMACS:
-21224 -21225  21226  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 2}_2 ∧ -b^{165, 2}_1 ∧ -b^{165, 2}_0 ∧ true) 
c  in CNF:
c    -b^{165, 2}_2 ∨  b^{165, 2}_1 ∨  b^{165, 2}_0 ∨ false 
c  in DIMACS:
-21224  21225  21226  0

c  3 does not represent an automaton state.
c    -(-b^{165, 2}_2 ∧  b^{165, 2}_1 ∧  b^{165, 2}_0 ∧ true) 
c  in CNF:
c     b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ false 
c  in DIMACS:
 21224 -21225 -21226  0
c  -3 does not represent an automaton state.
c    -( b^{165, 2}_2 ∧  b^{165, 2}_1 ∧  b^{165, 2}_0 ∧ true) 
c  in CNF:
c    -b^{165, 2}_2 ∨ -b^{165, 2}_1 ∨ -b^{165, 2}_0 ∨ false 
c  in DIMACS:
-21224 -21225 -21226  0

c i = 3
c  -2+1 --> -1
c    ( b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧  p_495) -> ( b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0)
c  in CNF:
c    -b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨  b^{165, 4}_2
c    -b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_1
c    -b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨  b^{165, 4}_0
c  in DIMACS:
-21227 -21228  21229 -495  21230 0
-21227 -21228  21229 -495 -21231 0
-21227 -21228  21229 -495  21232 0

c  -1+1 --> 0
c    ( b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0 ∧  p_495) -> (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧ -b^{165, 4}_0)
c  in CNF:
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_2
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_1
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_0
c  in DIMACS:
-21227  21228 -21229 -495 -21230 0
-21227  21228 -21229 -495 -21231 0
-21227  21228 -21229 -495 -21232 0

c  0+1 --> 1
c    (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧  p_495) -> (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0)
c  in CNF:
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_2
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_1
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨  b^{165, 4}_0
c  in DIMACS:
 21227  21228  21229 -495 -21230 0
 21227  21228  21229 -495 -21231 0
 21227  21228  21229 -495  21232 0

c  1+1 --> 2
c    (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0 ∧  p_495) -> (-b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0)
c  in CNF:
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_2
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨  b^{165, 4}_1
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ -p_495 ∨ -b^{165, 4}_0
c  in DIMACS:
 21227  21228 -21229 -495 -21230 0
 21227  21228 -21229 -495  21231 0
 21227  21228 -21229 -495 -21232 0

c  2+1 --> break 
c    (-b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧  p_495) -> break
c  in CNF:
c     b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ -p_495 ∨ break
c  in DIMACS:
 21227 -21228  21229 -495 1162 0


c  2-1 --> 1
c    (-b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧ -p_495) -> (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0)
c  in CNF:
c     b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_2
c     b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_1
c     b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨  b^{165, 4}_0
c  in DIMACS:
 21227 -21228  21229  495 -21230 0
 21227 -21228  21229  495 -21231 0
 21227 -21228  21229  495  21232 0

c  1-1 --> 0
c    (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0 ∧ -p_495) -> (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧ -b^{165, 4}_0)
c  in CNF:
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_2
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_1
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_0
c  in DIMACS:
 21227  21228 -21229  495 -21230 0
 21227  21228 -21229  495 -21231 0
 21227  21228 -21229  495 -21232 0

c  0-1 --> -1
c    (-b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧ -p_495) -> ( b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0)
c  in CNF:
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨  b^{165, 4}_2
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_1
c     b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨  b^{165, 4}_0
c  in DIMACS:
 21227  21228  21229  495  21230 0
 21227  21228  21229  495 -21231 0
 21227  21228  21229  495  21232 0

c  -1-1 --> -2
c    ( b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧  b^{165, 3}_0 ∧ -p_495) -> ( b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0)
c  in CNF:
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨  b^{165, 4}_2
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨  b^{165, 4}_1
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨  p_495 ∨ -b^{165, 4}_0
c  in DIMACS:
-21227  21228 -21229  495  21230 0
-21227  21228 -21229  495  21231 0
-21227  21228 -21229  495 -21232 0

c  -2-1 --> break 
c    ( b^{165, 3}_2 ∧  b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧ -p_495) -> break
c  in CNF:
c    -b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨  b^{165, 3}_0 ∨  p_495 ∨ break
c  in DIMACS:
-21227 -21228  21229  495 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 3}_2 ∧ -b^{165, 3}_1 ∧ -b^{165, 3}_0 ∧ true) 
c  in CNF:
c    -b^{165, 3}_2 ∨  b^{165, 3}_1 ∨  b^{165, 3}_0 ∨ false 
c  in DIMACS:
-21227  21228  21229  0

c  3 does not represent an automaton state.
c    -(-b^{165, 3}_2 ∧  b^{165, 3}_1 ∧  b^{165, 3}_0 ∧ true) 
c  in CNF:
c     b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ false 
c  in DIMACS:
 21227 -21228 -21229  0
c  -3 does not represent an automaton state.
c    -( b^{165, 3}_2 ∧  b^{165, 3}_1 ∧  b^{165, 3}_0 ∧ true) 
c  in CNF:
c    -b^{165, 3}_2 ∨ -b^{165, 3}_1 ∨ -b^{165, 3}_0 ∨ false 
c  in DIMACS:
-21227 -21228 -21229  0

c i = 4
c  -2+1 --> -1
c    ( b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧  p_660) -> ( b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0)
c  in CNF:
c    -b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨  b^{165, 5}_2
c    -b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_1
c    -b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨  b^{165, 5}_0
c  in DIMACS:
-21230 -21231  21232 -660  21233 0
-21230 -21231  21232 -660 -21234 0
-21230 -21231  21232 -660  21235 0

c  -1+1 --> 0
c    ( b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0 ∧  p_660) -> (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧ -b^{165, 5}_0)
c  in CNF:
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_2
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_1
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_0
c  in DIMACS:
-21230  21231 -21232 -660 -21233 0
-21230  21231 -21232 -660 -21234 0
-21230  21231 -21232 -660 -21235 0

c  0+1 --> 1
c    (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧  p_660) -> (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0)
c  in CNF:
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_2
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_1
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨  b^{165, 5}_0
c  in DIMACS:
 21230  21231  21232 -660 -21233 0
 21230  21231  21232 -660 -21234 0
 21230  21231  21232 -660  21235 0

c  1+1 --> 2
c    (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0 ∧  p_660) -> (-b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0)
c  in CNF:
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_2
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨  b^{165, 5}_1
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ -p_660 ∨ -b^{165, 5}_0
c  in DIMACS:
 21230  21231 -21232 -660 -21233 0
 21230  21231 -21232 -660  21234 0
 21230  21231 -21232 -660 -21235 0

c  2+1 --> break 
c    (-b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧  p_660) -> break
c  in CNF:
c     b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 21230 -21231  21232 -660 1162 0


c  2-1 --> 1
c    (-b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧ -p_660) -> (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0)
c  in CNF:
c     b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_2
c     b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_1
c     b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨  b^{165, 5}_0
c  in DIMACS:
 21230 -21231  21232  660 -21233 0
 21230 -21231  21232  660 -21234 0
 21230 -21231  21232  660  21235 0

c  1-1 --> 0
c    (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0 ∧ -p_660) -> (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧ -b^{165, 5}_0)
c  in CNF:
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_2
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_1
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_0
c  in DIMACS:
 21230  21231 -21232  660 -21233 0
 21230  21231 -21232  660 -21234 0
 21230  21231 -21232  660 -21235 0

c  0-1 --> -1
c    (-b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧ -p_660) -> ( b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0)
c  in CNF:
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨  b^{165, 5}_2
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_1
c     b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨  b^{165, 5}_0
c  in DIMACS:
 21230  21231  21232  660  21233 0
 21230  21231  21232  660 -21234 0
 21230  21231  21232  660  21235 0

c  -1-1 --> -2
c    ( b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧  b^{165, 4}_0 ∧ -p_660) -> ( b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0)
c  in CNF:
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨  b^{165, 5}_2
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨  b^{165, 5}_1
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨  p_660 ∨ -b^{165, 5}_0
c  in DIMACS:
-21230  21231 -21232  660  21233 0
-21230  21231 -21232  660  21234 0
-21230  21231 -21232  660 -21235 0

c  -2-1 --> break 
c    ( b^{165, 4}_2 ∧  b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨  b^{165, 4}_0 ∨  p_660 ∨ break
c  in DIMACS:
-21230 -21231  21232  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 4}_2 ∧ -b^{165, 4}_1 ∧ -b^{165, 4}_0 ∧ true) 
c  in CNF:
c    -b^{165, 4}_2 ∨  b^{165, 4}_1 ∨  b^{165, 4}_0 ∨ false 
c  in DIMACS:
-21230  21231  21232  0

c  3 does not represent an automaton state.
c    -(-b^{165, 4}_2 ∧  b^{165, 4}_1 ∧  b^{165, 4}_0 ∧ true) 
c  in CNF:
c     b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ false 
c  in DIMACS:
 21230 -21231 -21232  0
c  -3 does not represent an automaton state.
c    -( b^{165, 4}_2 ∧  b^{165, 4}_1 ∧  b^{165, 4}_0 ∧ true) 
c  in CNF:
c    -b^{165, 4}_2 ∨ -b^{165, 4}_1 ∨ -b^{165, 4}_0 ∨ false 
c  in DIMACS:
-21230 -21231 -21232  0

c i = 5
c  -2+1 --> -1
c    ( b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧  p_825) -> ( b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0)
c  in CNF:
c    -b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨  b^{165, 6}_2
c    -b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_1
c    -b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨  b^{165, 6}_0
c  in DIMACS:
-21233 -21234  21235 -825  21236 0
-21233 -21234  21235 -825 -21237 0
-21233 -21234  21235 -825  21238 0

c  -1+1 --> 0
c    ( b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0 ∧  p_825) -> (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧ -b^{165, 6}_0)
c  in CNF:
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_2
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_1
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_0
c  in DIMACS:
-21233  21234 -21235 -825 -21236 0
-21233  21234 -21235 -825 -21237 0
-21233  21234 -21235 -825 -21238 0

c  0+1 --> 1
c    (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧  p_825) -> (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0)
c  in CNF:
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_2
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_1
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨  b^{165, 6}_0
c  in DIMACS:
 21233  21234  21235 -825 -21236 0
 21233  21234  21235 -825 -21237 0
 21233  21234  21235 -825  21238 0

c  1+1 --> 2
c    (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0 ∧  p_825) -> (-b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0)
c  in CNF:
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_2
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨  b^{165, 6}_1
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ -p_825 ∨ -b^{165, 6}_0
c  in DIMACS:
 21233  21234 -21235 -825 -21236 0
 21233  21234 -21235 -825  21237 0
 21233  21234 -21235 -825 -21238 0

c  2+1 --> break 
c    (-b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧  p_825) -> break
c  in CNF:
c     b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 21233 -21234  21235 -825 1162 0


c  2-1 --> 1
c    (-b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧ -p_825) -> (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0)
c  in CNF:
c     b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_2
c     b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_1
c     b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨  b^{165, 6}_0
c  in DIMACS:
 21233 -21234  21235  825 -21236 0
 21233 -21234  21235  825 -21237 0
 21233 -21234  21235  825  21238 0

c  1-1 --> 0
c    (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0 ∧ -p_825) -> (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧ -b^{165, 6}_0)
c  in CNF:
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_2
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_1
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_0
c  in DIMACS:
 21233  21234 -21235  825 -21236 0
 21233  21234 -21235  825 -21237 0
 21233  21234 -21235  825 -21238 0

c  0-1 --> -1
c    (-b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧ -p_825) -> ( b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0)
c  in CNF:
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨  b^{165, 6}_2
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_1
c     b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨  b^{165, 6}_0
c  in DIMACS:
 21233  21234  21235  825  21236 0
 21233  21234  21235  825 -21237 0
 21233  21234  21235  825  21238 0

c  -1-1 --> -2
c    ( b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧  b^{165, 5}_0 ∧ -p_825) -> ( b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0)
c  in CNF:
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨  b^{165, 6}_2
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨  b^{165, 6}_1
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨  p_825 ∨ -b^{165, 6}_0
c  in DIMACS:
-21233  21234 -21235  825  21236 0
-21233  21234 -21235  825  21237 0
-21233  21234 -21235  825 -21238 0

c  -2-1 --> break 
c    ( b^{165, 5}_2 ∧  b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨  b^{165, 5}_0 ∨  p_825 ∨ break
c  in DIMACS:
-21233 -21234  21235  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 5}_2 ∧ -b^{165, 5}_1 ∧ -b^{165, 5}_0 ∧ true) 
c  in CNF:
c    -b^{165, 5}_2 ∨  b^{165, 5}_1 ∨  b^{165, 5}_0 ∨ false 
c  in DIMACS:
-21233  21234  21235  0

c  3 does not represent an automaton state.
c    -(-b^{165, 5}_2 ∧  b^{165, 5}_1 ∧  b^{165, 5}_0 ∧ true) 
c  in CNF:
c     b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ false 
c  in DIMACS:
 21233 -21234 -21235  0
c  -3 does not represent an automaton state.
c    -( b^{165, 5}_2 ∧  b^{165, 5}_1 ∧  b^{165, 5}_0 ∧ true) 
c  in CNF:
c    -b^{165, 5}_2 ∨ -b^{165, 5}_1 ∨ -b^{165, 5}_0 ∨ false 
c  in DIMACS:
-21233 -21234 -21235  0

c i = 6
c  -2+1 --> -1
c    ( b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧  p_990) -> ( b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0)
c  in CNF:
c    -b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨  b^{165, 7}_2
c    -b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_1
c    -b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨  b^{165, 7}_0
c  in DIMACS:
-21236 -21237  21238 -990  21239 0
-21236 -21237  21238 -990 -21240 0
-21236 -21237  21238 -990  21241 0

c  -1+1 --> 0
c    ( b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0 ∧  p_990) -> (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧ -b^{165, 7}_0)
c  in CNF:
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_2
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_1
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_0
c  in DIMACS:
-21236  21237 -21238 -990 -21239 0
-21236  21237 -21238 -990 -21240 0
-21236  21237 -21238 -990 -21241 0

c  0+1 --> 1
c    (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧  p_990) -> (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0)
c  in CNF:
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_2
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_1
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨  b^{165, 7}_0
c  in DIMACS:
 21236  21237  21238 -990 -21239 0
 21236  21237  21238 -990 -21240 0
 21236  21237  21238 -990  21241 0

c  1+1 --> 2
c    (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0 ∧  p_990) -> (-b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0)
c  in CNF:
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_2
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨  b^{165, 7}_1
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ -p_990 ∨ -b^{165, 7}_0
c  in DIMACS:
 21236  21237 -21238 -990 -21239 0
 21236  21237 -21238 -990  21240 0
 21236  21237 -21238 -990 -21241 0

c  2+1 --> break 
c    (-b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧  p_990) -> break
c  in CNF:
c     b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 21236 -21237  21238 -990 1162 0


c  2-1 --> 1
c    (-b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧ -p_990) -> (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0)
c  in CNF:
c     b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_2
c     b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_1
c     b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨  b^{165, 7}_0
c  in DIMACS:
 21236 -21237  21238  990 -21239 0
 21236 -21237  21238  990 -21240 0
 21236 -21237  21238  990  21241 0

c  1-1 --> 0
c    (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0 ∧ -p_990) -> (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧ -b^{165, 7}_0)
c  in CNF:
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_2
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_1
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_0
c  in DIMACS:
 21236  21237 -21238  990 -21239 0
 21236  21237 -21238  990 -21240 0
 21236  21237 -21238  990 -21241 0

c  0-1 --> -1
c    (-b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧ -p_990) -> ( b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0)
c  in CNF:
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨  b^{165, 7}_2
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_1
c     b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨  b^{165, 7}_0
c  in DIMACS:
 21236  21237  21238  990  21239 0
 21236  21237  21238  990 -21240 0
 21236  21237  21238  990  21241 0

c  -1-1 --> -2
c    ( b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧  b^{165, 6}_0 ∧ -p_990) -> ( b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0)
c  in CNF:
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨  b^{165, 7}_2
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨  b^{165, 7}_1
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨  p_990 ∨ -b^{165, 7}_0
c  in DIMACS:
-21236  21237 -21238  990  21239 0
-21236  21237 -21238  990  21240 0
-21236  21237 -21238  990 -21241 0

c  -2-1 --> break 
c    ( b^{165, 6}_2 ∧  b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨  b^{165, 6}_0 ∨  p_990 ∨ break
c  in DIMACS:
-21236 -21237  21238  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 6}_2 ∧ -b^{165, 6}_1 ∧ -b^{165, 6}_0 ∧ true) 
c  in CNF:
c    -b^{165, 6}_2 ∨  b^{165, 6}_1 ∨  b^{165, 6}_0 ∨ false 
c  in DIMACS:
-21236  21237  21238  0

c  3 does not represent an automaton state.
c    -(-b^{165, 6}_2 ∧  b^{165, 6}_1 ∧  b^{165, 6}_0 ∧ true) 
c  in CNF:
c     b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ false 
c  in DIMACS:
 21236 -21237 -21238  0
c  -3 does not represent an automaton state.
c    -( b^{165, 6}_2 ∧  b^{165, 6}_1 ∧  b^{165, 6}_0 ∧ true) 
c  in CNF:
c    -b^{165, 6}_2 ∨ -b^{165, 6}_1 ∨ -b^{165, 6}_0 ∨ false 
c  in DIMACS:
-21236 -21237 -21238  0

c i = 7
c  -2+1 --> -1
c    ( b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧  p_1155) -> ( b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧  b^{165, 8}_0)
c  in CNF:
c    -b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨  b^{165, 8}_2
c    -b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_1
c    -b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨  b^{165, 8}_0
c  in DIMACS:
-21239 -21240  21241 -1155  21242 0
-21239 -21240  21241 -1155 -21243 0
-21239 -21240  21241 -1155  21244 0

c  -1+1 --> 0
c    ( b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0 ∧  p_1155) -> (-b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧ -b^{165, 8}_0)
c  in CNF:
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_2
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_1
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_0
c  in DIMACS:
-21239  21240 -21241 -1155 -21242 0
-21239  21240 -21241 -1155 -21243 0
-21239  21240 -21241 -1155 -21244 0

c  0+1 --> 1
c    (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧  p_1155) -> (-b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧  b^{165, 8}_0)
c  in CNF:
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_2
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_1
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨  b^{165, 8}_0
c  in DIMACS:
 21239  21240  21241 -1155 -21242 0
 21239  21240  21241 -1155 -21243 0
 21239  21240  21241 -1155  21244 0

c  1+1 --> 2
c    (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0 ∧  p_1155) -> (-b^{165, 8}_2 ∧  b^{165, 8}_1 ∧ -b^{165, 8}_0)
c  in CNF:
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_2
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨  b^{165, 8}_1
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ -p_1155 ∨ -b^{165, 8}_0
c  in DIMACS:
 21239  21240 -21241 -1155 -21242 0
 21239  21240 -21241 -1155  21243 0
 21239  21240 -21241 -1155 -21244 0

c  2+1 --> break 
c    (-b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 21239 -21240  21241 -1155 1162 0


c  2-1 --> 1
c    (-b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧ -p_1155) -> (-b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧  b^{165, 8}_0)
c  in CNF:
c     b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_2
c     b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_1
c     b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨  b^{165, 8}_0
c  in DIMACS:
 21239 -21240  21241  1155 -21242 0
 21239 -21240  21241  1155 -21243 0
 21239 -21240  21241  1155  21244 0

c  1-1 --> 0
c    (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0 ∧ -p_1155) -> (-b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧ -b^{165, 8}_0)
c  in CNF:
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_2
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_1
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_0
c  in DIMACS:
 21239  21240 -21241  1155 -21242 0
 21239  21240 -21241  1155 -21243 0
 21239  21240 -21241  1155 -21244 0

c  0-1 --> -1
c    (-b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧ -p_1155) -> ( b^{165, 8}_2 ∧ -b^{165, 8}_1 ∧  b^{165, 8}_0)
c  in CNF:
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨  b^{165, 8}_2
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_1
c     b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨  b^{165, 8}_0
c  in DIMACS:
 21239  21240  21241  1155  21242 0
 21239  21240  21241  1155 -21243 0
 21239  21240  21241  1155  21244 0

c  -1-1 --> -2
c    ( b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧  b^{165, 7}_0 ∧ -p_1155) -> ( b^{165, 8}_2 ∧  b^{165, 8}_1 ∧ -b^{165, 8}_0)
c  in CNF:
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨  b^{165, 8}_2
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨  b^{165, 8}_1
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨  p_1155 ∨ -b^{165, 8}_0
c  in DIMACS:
-21239  21240 -21241  1155  21242 0
-21239  21240 -21241  1155  21243 0
-21239  21240 -21241  1155 -21244 0

c  -2-1 --> break 
c    ( b^{165, 7}_2 ∧  b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨  b^{165, 7}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-21239 -21240  21241  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{165, 7}_2 ∧ -b^{165, 7}_1 ∧ -b^{165, 7}_0 ∧ true) 
c  in CNF:
c    -b^{165, 7}_2 ∨  b^{165, 7}_1 ∨  b^{165, 7}_0 ∨ false 
c  in DIMACS:
-21239  21240  21241  0

c  3 does not represent an automaton state.
c    -(-b^{165, 7}_2 ∧  b^{165, 7}_1 ∧  b^{165, 7}_0 ∧ true) 
c  in CNF:
c     b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ false 
c  in DIMACS:
 21239 -21240 -21241  0
c  -3 does not represent an automaton state.
c    -( b^{165, 7}_2 ∧  b^{165, 7}_1 ∧  b^{165, 7}_0 ∧ true) 
c  in CNF:
c    -b^{165, 7}_2 ∨ -b^{165, 7}_1 ∨ -b^{165, 7}_0 ∨ false 
c  in DIMACS:
-21239 -21240 -21241  0

c INIT for k = 166
c    -b^{166, 1}_2
c    -b^{166, 1}_1
c    -b^{166, 1}_0
c  in DIMACS:
-21245 0
-21246 0
-21247 0

c Transitions for k = 166
c i = 1
c  -2+1 --> -1
c    ( b^{166, 1}_2 ∧  b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧  p_166) -> ( b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0)
c  in CNF:
c    -b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨  b^{166, 2}_2
c    -b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_1
c    -b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨  b^{166, 2}_0
c  in DIMACS:
-21245 -21246  21247 -166  21248 0
-21245 -21246  21247 -166 -21249 0
-21245 -21246  21247 -166  21250 0

c  -1+1 --> 0
c    ( b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧  b^{166, 1}_0 ∧  p_166) -> (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧ -b^{166, 2}_0)
c  in CNF:
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_2
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_1
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_0
c  in DIMACS:
-21245  21246 -21247 -166 -21248 0
-21245  21246 -21247 -166 -21249 0
-21245  21246 -21247 -166 -21250 0

c  0+1 --> 1
c    (-b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧  p_166) -> (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0)
c  in CNF:
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_2
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_1
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨  b^{166, 2}_0
c  in DIMACS:
 21245  21246  21247 -166 -21248 0
 21245  21246  21247 -166 -21249 0
 21245  21246  21247 -166  21250 0

c  1+1 --> 2
c    (-b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧  b^{166, 1}_0 ∧  p_166) -> (-b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0)
c  in CNF:
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_2
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨  b^{166, 2}_1
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ -p_166 ∨ -b^{166, 2}_0
c  in DIMACS:
 21245  21246 -21247 -166 -21248 0
 21245  21246 -21247 -166  21249 0
 21245  21246 -21247 -166 -21250 0

c  2+1 --> break 
c    (-b^{166, 1}_2 ∧  b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧  p_166) -> break
c  in CNF:
c     b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ -p_166 ∨ break
c  in DIMACS:
 21245 -21246  21247 -166 1162 0


c  2-1 --> 1
c    (-b^{166, 1}_2 ∧  b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧ -p_166) -> (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0)
c  in CNF:
c     b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_2
c     b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_1
c     b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨  b^{166, 2}_0
c  in DIMACS:
 21245 -21246  21247  166 -21248 0
 21245 -21246  21247  166 -21249 0
 21245 -21246  21247  166  21250 0

c  1-1 --> 0
c    (-b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧  b^{166, 1}_0 ∧ -p_166) -> (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧ -b^{166, 2}_0)
c  in CNF:
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_2
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_1
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_0
c  in DIMACS:
 21245  21246 -21247  166 -21248 0
 21245  21246 -21247  166 -21249 0
 21245  21246 -21247  166 -21250 0

c  0-1 --> -1
c    (-b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧ -p_166) -> ( b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0)
c  in CNF:
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨  b^{166, 2}_2
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_1
c     b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨  b^{166, 2}_0
c  in DIMACS:
 21245  21246  21247  166  21248 0
 21245  21246  21247  166 -21249 0
 21245  21246  21247  166  21250 0

c  -1-1 --> -2
c    ( b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧  b^{166, 1}_0 ∧ -p_166) -> ( b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0)
c  in CNF:
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨  b^{166, 2}_2
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨  b^{166, 2}_1
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨  p_166 ∨ -b^{166, 2}_0
c  in DIMACS:
-21245  21246 -21247  166  21248 0
-21245  21246 -21247  166  21249 0
-21245  21246 -21247  166 -21250 0

c  -2-1 --> break 
c    ( b^{166, 1}_2 ∧  b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧ -p_166) -> break
c  in CNF:
c    -b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨  b^{166, 1}_0 ∨  p_166 ∨ break
c  in DIMACS:
-21245 -21246  21247  166 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 1}_2 ∧ -b^{166, 1}_1 ∧ -b^{166, 1}_0 ∧ true) 
c  in CNF:
c    -b^{166, 1}_2 ∨  b^{166, 1}_1 ∨  b^{166, 1}_0 ∨ false 
c  in DIMACS:
-21245  21246  21247  0

c  3 does not represent an automaton state.
c    -(-b^{166, 1}_2 ∧  b^{166, 1}_1 ∧  b^{166, 1}_0 ∧ true) 
c  in CNF:
c     b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ false 
c  in DIMACS:
 21245 -21246 -21247  0
c  -3 does not represent an automaton state.
c    -( b^{166, 1}_2 ∧  b^{166, 1}_1 ∧  b^{166, 1}_0 ∧ true) 
c  in CNF:
c    -b^{166, 1}_2 ∨ -b^{166, 1}_1 ∨ -b^{166, 1}_0 ∨ false 
c  in DIMACS:
-21245 -21246 -21247  0

c i = 2
c  -2+1 --> -1
c    ( b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧  p_332) -> ( b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0)
c  in CNF:
c    -b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨  b^{166, 3}_2
c    -b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_1
c    -b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨  b^{166, 3}_0
c  in DIMACS:
-21248 -21249  21250 -332  21251 0
-21248 -21249  21250 -332 -21252 0
-21248 -21249  21250 -332  21253 0

c  -1+1 --> 0
c    ( b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0 ∧  p_332) -> (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧ -b^{166, 3}_0)
c  in CNF:
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_2
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_1
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_0
c  in DIMACS:
-21248  21249 -21250 -332 -21251 0
-21248  21249 -21250 -332 -21252 0
-21248  21249 -21250 -332 -21253 0

c  0+1 --> 1
c    (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧  p_332) -> (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0)
c  in CNF:
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_2
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_1
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨  b^{166, 3}_0
c  in DIMACS:
 21248  21249  21250 -332 -21251 0
 21248  21249  21250 -332 -21252 0
 21248  21249  21250 -332  21253 0

c  1+1 --> 2
c    (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0 ∧  p_332) -> (-b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0)
c  in CNF:
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_2
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨  b^{166, 3}_1
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ -p_332 ∨ -b^{166, 3}_0
c  in DIMACS:
 21248  21249 -21250 -332 -21251 0
 21248  21249 -21250 -332  21252 0
 21248  21249 -21250 -332 -21253 0

c  2+1 --> break 
c    (-b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧  p_332) -> break
c  in CNF:
c     b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 21248 -21249  21250 -332 1162 0


c  2-1 --> 1
c    (-b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧ -p_332) -> (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0)
c  in CNF:
c     b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_2
c     b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_1
c     b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨  b^{166, 3}_0
c  in DIMACS:
 21248 -21249  21250  332 -21251 0
 21248 -21249  21250  332 -21252 0
 21248 -21249  21250  332  21253 0

c  1-1 --> 0
c    (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0 ∧ -p_332) -> (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧ -b^{166, 3}_0)
c  in CNF:
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_2
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_1
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_0
c  in DIMACS:
 21248  21249 -21250  332 -21251 0
 21248  21249 -21250  332 -21252 0
 21248  21249 -21250  332 -21253 0

c  0-1 --> -1
c    (-b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧ -p_332) -> ( b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0)
c  in CNF:
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨  b^{166, 3}_2
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_1
c     b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨  b^{166, 3}_0
c  in DIMACS:
 21248  21249  21250  332  21251 0
 21248  21249  21250  332 -21252 0
 21248  21249  21250  332  21253 0

c  -1-1 --> -2
c    ( b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧  b^{166, 2}_0 ∧ -p_332) -> ( b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0)
c  in CNF:
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨  b^{166, 3}_2
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨  b^{166, 3}_1
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨  p_332 ∨ -b^{166, 3}_0
c  in DIMACS:
-21248  21249 -21250  332  21251 0
-21248  21249 -21250  332  21252 0
-21248  21249 -21250  332 -21253 0

c  -2-1 --> break 
c    ( b^{166, 2}_2 ∧  b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨  b^{166, 2}_0 ∨  p_332 ∨ break
c  in DIMACS:
-21248 -21249  21250  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 2}_2 ∧ -b^{166, 2}_1 ∧ -b^{166, 2}_0 ∧ true) 
c  in CNF:
c    -b^{166, 2}_2 ∨  b^{166, 2}_1 ∨  b^{166, 2}_0 ∨ false 
c  in DIMACS:
-21248  21249  21250  0

c  3 does not represent an automaton state.
c    -(-b^{166, 2}_2 ∧  b^{166, 2}_1 ∧  b^{166, 2}_0 ∧ true) 
c  in CNF:
c     b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ false 
c  in DIMACS:
 21248 -21249 -21250  0
c  -3 does not represent an automaton state.
c    -( b^{166, 2}_2 ∧  b^{166, 2}_1 ∧  b^{166, 2}_0 ∧ true) 
c  in CNF:
c    -b^{166, 2}_2 ∨ -b^{166, 2}_1 ∨ -b^{166, 2}_0 ∨ false 
c  in DIMACS:
-21248 -21249 -21250  0

c i = 3
c  -2+1 --> -1
c    ( b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧  p_498) -> ( b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0)
c  in CNF:
c    -b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨  b^{166, 4}_2
c    -b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_1
c    -b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨  b^{166, 4}_0
c  in DIMACS:
-21251 -21252  21253 -498  21254 0
-21251 -21252  21253 -498 -21255 0
-21251 -21252  21253 -498  21256 0

c  -1+1 --> 0
c    ( b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0 ∧  p_498) -> (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧ -b^{166, 4}_0)
c  in CNF:
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_2
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_1
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_0
c  in DIMACS:
-21251  21252 -21253 -498 -21254 0
-21251  21252 -21253 -498 -21255 0
-21251  21252 -21253 -498 -21256 0

c  0+1 --> 1
c    (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧  p_498) -> (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0)
c  in CNF:
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_2
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_1
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨  b^{166, 4}_0
c  in DIMACS:
 21251  21252  21253 -498 -21254 0
 21251  21252  21253 -498 -21255 0
 21251  21252  21253 -498  21256 0

c  1+1 --> 2
c    (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0 ∧  p_498) -> (-b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0)
c  in CNF:
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_2
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨  b^{166, 4}_1
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ -p_498 ∨ -b^{166, 4}_0
c  in DIMACS:
 21251  21252 -21253 -498 -21254 0
 21251  21252 -21253 -498  21255 0
 21251  21252 -21253 -498 -21256 0

c  2+1 --> break 
c    (-b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧  p_498) -> break
c  in CNF:
c     b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 21251 -21252  21253 -498 1162 0


c  2-1 --> 1
c    (-b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧ -p_498) -> (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0)
c  in CNF:
c     b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_2
c     b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_1
c     b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨  b^{166, 4}_0
c  in DIMACS:
 21251 -21252  21253  498 -21254 0
 21251 -21252  21253  498 -21255 0
 21251 -21252  21253  498  21256 0

c  1-1 --> 0
c    (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0 ∧ -p_498) -> (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧ -b^{166, 4}_0)
c  in CNF:
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_2
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_1
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_0
c  in DIMACS:
 21251  21252 -21253  498 -21254 0
 21251  21252 -21253  498 -21255 0
 21251  21252 -21253  498 -21256 0

c  0-1 --> -1
c    (-b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧ -p_498) -> ( b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0)
c  in CNF:
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨  b^{166, 4}_2
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_1
c     b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨  b^{166, 4}_0
c  in DIMACS:
 21251  21252  21253  498  21254 0
 21251  21252  21253  498 -21255 0
 21251  21252  21253  498  21256 0

c  -1-1 --> -2
c    ( b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧  b^{166, 3}_0 ∧ -p_498) -> ( b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0)
c  in CNF:
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨  b^{166, 4}_2
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨  b^{166, 4}_1
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨  p_498 ∨ -b^{166, 4}_0
c  in DIMACS:
-21251  21252 -21253  498  21254 0
-21251  21252 -21253  498  21255 0
-21251  21252 -21253  498 -21256 0

c  -2-1 --> break 
c    ( b^{166, 3}_2 ∧  b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨  b^{166, 3}_0 ∨  p_498 ∨ break
c  in DIMACS:
-21251 -21252  21253  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 3}_2 ∧ -b^{166, 3}_1 ∧ -b^{166, 3}_0 ∧ true) 
c  in CNF:
c    -b^{166, 3}_2 ∨  b^{166, 3}_1 ∨  b^{166, 3}_0 ∨ false 
c  in DIMACS:
-21251  21252  21253  0

c  3 does not represent an automaton state.
c    -(-b^{166, 3}_2 ∧  b^{166, 3}_1 ∧  b^{166, 3}_0 ∧ true) 
c  in CNF:
c     b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ false 
c  in DIMACS:
 21251 -21252 -21253  0
c  -3 does not represent an automaton state.
c    -( b^{166, 3}_2 ∧  b^{166, 3}_1 ∧  b^{166, 3}_0 ∧ true) 
c  in CNF:
c    -b^{166, 3}_2 ∨ -b^{166, 3}_1 ∨ -b^{166, 3}_0 ∨ false 
c  in DIMACS:
-21251 -21252 -21253  0

c i = 4
c  -2+1 --> -1
c    ( b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧  p_664) -> ( b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0)
c  in CNF:
c    -b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨  b^{166, 5}_2
c    -b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_1
c    -b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨  b^{166, 5}_0
c  in DIMACS:
-21254 -21255  21256 -664  21257 0
-21254 -21255  21256 -664 -21258 0
-21254 -21255  21256 -664  21259 0

c  -1+1 --> 0
c    ( b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0 ∧  p_664) -> (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧ -b^{166, 5}_0)
c  in CNF:
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_2
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_1
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_0
c  in DIMACS:
-21254  21255 -21256 -664 -21257 0
-21254  21255 -21256 -664 -21258 0
-21254  21255 -21256 -664 -21259 0

c  0+1 --> 1
c    (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧  p_664) -> (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0)
c  in CNF:
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_2
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_1
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨  b^{166, 5}_0
c  in DIMACS:
 21254  21255  21256 -664 -21257 0
 21254  21255  21256 -664 -21258 0
 21254  21255  21256 -664  21259 0

c  1+1 --> 2
c    (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0 ∧  p_664) -> (-b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0)
c  in CNF:
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_2
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨  b^{166, 5}_1
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ -p_664 ∨ -b^{166, 5}_0
c  in DIMACS:
 21254  21255 -21256 -664 -21257 0
 21254  21255 -21256 -664  21258 0
 21254  21255 -21256 -664 -21259 0

c  2+1 --> break 
c    (-b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧  p_664) -> break
c  in CNF:
c     b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 21254 -21255  21256 -664 1162 0


c  2-1 --> 1
c    (-b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧ -p_664) -> (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0)
c  in CNF:
c     b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_2
c     b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_1
c     b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨  b^{166, 5}_0
c  in DIMACS:
 21254 -21255  21256  664 -21257 0
 21254 -21255  21256  664 -21258 0
 21254 -21255  21256  664  21259 0

c  1-1 --> 0
c    (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0 ∧ -p_664) -> (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧ -b^{166, 5}_0)
c  in CNF:
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_2
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_1
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_0
c  in DIMACS:
 21254  21255 -21256  664 -21257 0
 21254  21255 -21256  664 -21258 0
 21254  21255 -21256  664 -21259 0

c  0-1 --> -1
c    (-b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧ -p_664) -> ( b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0)
c  in CNF:
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨  b^{166, 5}_2
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_1
c     b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨  b^{166, 5}_0
c  in DIMACS:
 21254  21255  21256  664  21257 0
 21254  21255  21256  664 -21258 0
 21254  21255  21256  664  21259 0

c  -1-1 --> -2
c    ( b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧  b^{166, 4}_0 ∧ -p_664) -> ( b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0)
c  in CNF:
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨  b^{166, 5}_2
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨  b^{166, 5}_1
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨  p_664 ∨ -b^{166, 5}_0
c  in DIMACS:
-21254  21255 -21256  664  21257 0
-21254  21255 -21256  664  21258 0
-21254  21255 -21256  664 -21259 0

c  -2-1 --> break 
c    ( b^{166, 4}_2 ∧  b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨  b^{166, 4}_0 ∨  p_664 ∨ break
c  in DIMACS:
-21254 -21255  21256  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 4}_2 ∧ -b^{166, 4}_1 ∧ -b^{166, 4}_0 ∧ true) 
c  in CNF:
c    -b^{166, 4}_2 ∨  b^{166, 4}_1 ∨  b^{166, 4}_0 ∨ false 
c  in DIMACS:
-21254  21255  21256  0

c  3 does not represent an automaton state.
c    -(-b^{166, 4}_2 ∧  b^{166, 4}_1 ∧  b^{166, 4}_0 ∧ true) 
c  in CNF:
c     b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ false 
c  in DIMACS:
 21254 -21255 -21256  0
c  -3 does not represent an automaton state.
c    -( b^{166, 4}_2 ∧  b^{166, 4}_1 ∧  b^{166, 4}_0 ∧ true) 
c  in CNF:
c    -b^{166, 4}_2 ∨ -b^{166, 4}_1 ∨ -b^{166, 4}_0 ∨ false 
c  in DIMACS:
-21254 -21255 -21256  0

c i = 5
c  -2+1 --> -1
c    ( b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧  p_830) -> ( b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0)
c  in CNF:
c    -b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨  b^{166, 6}_2
c    -b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_1
c    -b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨  b^{166, 6}_0
c  in DIMACS:
-21257 -21258  21259 -830  21260 0
-21257 -21258  21259 -830 -21261 0
-21257 -21258  21259 -830  21262 0

c  -1+1 --> 0
c    ( b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0 ∧  p_830) -> (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧ -b^{166, 6}_0)
c  in CNF:
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_2
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_1
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_0
c  in DIMACS:
-21257  21258 -21259 -830 -21260 0
-21257  21258 -21259 -830 -21261 0
-21257  21258 -21259 -830 -21262 0

c  0+1 --> 1
c    (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧  p_830) -> (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0)
c  in CNF:
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_2
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_1
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨  b^{166, 6}_0
c  in DIMACS:
 21257  21258  21259 -830 -21260 0
 21257  21258  21259 -830 -21261 0
 21257  21258  21259 -830  21262 0

c  1+1 --> 2
c    (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0 ∧  p_830) -> (-b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0)
c  in CNF:
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_2
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨  b^{166, 6}_1
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ -p_830 ∨ -b^{166, 6}_0
c  in DIMACS:
 21257  21258 -21259 -830 -21260 0
 21257  21258 -21259 -830  21261 0
 21257  21258 -21259 -830 -21262 0

c  2+1 --> break 
c    (-b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧  p_830) -> break
c  in CNF:
c     b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ -p_830 ∨ break
c  in DIMACS:
 21257 -21258  21259 -830 1162 0


c  2-1 --> 1
c    (-b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧ -p_830) -> (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0)
c  in CNF:
c     b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_2
c     b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_1
c     b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨  b^{166, 6}_0
c  in DIMACS:
 21257 -21258  21259  830 -21260 0
 21257 -21258  21259  830 -21261 0
 21257 -21258  21259  830  21262 0

c  1-1 --> 0
c    (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0 ∧ -p_830) -> (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧ -b^{166, 6}_0)
c  in CNF:
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_2
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_1
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_0
c  in DIMACS:
 21257  21258 -21259  830 -21260 0
 21257  21258 -21259  830 -21261 0
 21257  21258 -21259  830 -21262 0

c  0-1 --> -1
c    (-b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧ -p_830) -> ( b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0)
c  in CNF:
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨  b^{166, 6}_2
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_1
c     b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨  b^{166, 6}_0
c  in DIMACS:
 21257  21258  21259  830  21260 0
 21257  21258  21259  830 -21261 0
 21257  21258  21259  830  21262 0

c  -1-1 --> -2
c    ( b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧  b^{166, 5}_0 ∧ -p_830) -> ( b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0)
c  in CNF:
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨  b^{166, 6}_2
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨  b^{166, 6}_1
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨  p_830 ∨ -b^{166, 6}_0
c  in DIMACS:
-21257  21258 -21259  830  21260 0
-21257  21258 -21259  830  21261 0
-21257  21258 -21259  830 -21262 0

c  -2-1 --> break 
c    ( b^{166, 5}_2 ∧  b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧ -p_830) -> break
c  in CNF:
c    -b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨  b^{166, 5}_0 ∨  p_830 ∨ break
c  in DIMACS:
-21257 -21258  21259  830 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 5}_2 ∧ -b^{166, 5}_1 ∧ -b^{166, 5}_0 ∧ true) 
c  in CNF:
c    -b^{166, 5}_2 ∨  b^{166, 5}_1 ∨  b^{166, 5}_0 ∨ false 
c  in DIMACS:
-21257  21258  21259  0

c  3 does not represent an automaton state.
c    -(-b^{166, 5}_2 ∧  b^{166, 5}_1 ∧  b^{166, 5}_0 ∧ true) 
c  in CNF:
c     b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ false 
c  in DIMACS:
 21257 -21258 -21259  0
c  -3 does not represent an automaton state.
c    -( b^{166, 5}_2 ∧  b^{166, 5}_1 ∧  b^{166, 5}_0 ∧ true) 
c  in CNF:
c    -b^{166, 5}_2 ∨ -b^{166, 5}_1 ∨ -b^{166, 5}_0 ∨ false 
c  in DIMACS:
-21257 -21258 -21259  0

c i = 6
c  -2+1 --> -1
c    ( b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧  p_996) -> ( b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧  b^{166, 7}_0)
c  in CNF:
c    -b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨  b^{166, 7}_2
c    -b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_1
c    -b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨  b^{166, 7}_0
c  in DIMACS:
-21260 -21261  21262 -996  21263 0
-21260 -21261  21262 -996 -21264 0
-21260 -21261  21262 -996  21265 0

c  -1+1 --> 0
c    ( b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0 ∧  p_996) -> (-b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧ -b^{166, 7}_0)
c  in CNF:
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_2
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_1
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_0
c  in DIMACS:
-21260  21261 -21262 -996 -21263 0
-21260  21261 -21262 -996 -21264 0
-21260  21261 -21262 -996 -21265 0

c  0+1 --> 1
c    (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧  p_996) -> (-b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧  b^{166, 7}_0)
c  in CNF:
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_2
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_1
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨  b^{166, 7}_0
c  in DIMACS:
 21260  21261  21262 -996 -21263 0
 21260  21261  21262 -996 -21264 0
 21260  21261  21262 -996  21265 0

c  1+1 --> 2
c    (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0 ∧  p_996) -> (-b^{166, 7}_2 ∧  b^{166, 7}_1 ∧ -b^{166, 7}_0)
c  in CNF:
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_2
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨  b^{166, 7}_1
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ -p_996 ∨ -b^{166, 7}_0
c  in DIMACS:
 21260  21261 -21262 -996 -21263 0
 21260  21261 -21262 -996  21264 0
 21260  21261 -21262 -996 -21265 0

c  2+1 --> break 
c    (-b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧  p_996) -> break
c  in CNF:
c     b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 21260 -21261  21262 -996 1162 0


c  2-1 --> 1
c    (-b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧ -p_996) -> (-b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧  b^{166, 7}_0)
c  in CNF:
c     b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_2
c     b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_1
c     b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨  b^{166, 7}_0
c  in DIMACS:
 21260 -21261  21262  996 -21263 0
 21260 -21261  21262  996 -21264 0
 21260 -21261  21262  996  21265 0

c  1-1 --> 0
c    (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0 ∧ -p_996) -> (-b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧ -b^{166, 7}_0)
c  in CNF:
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_2
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_1
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_0
c  in DIMACS:
 21260  21261 -21262  996 -21263 0
 21260  21261 -21262  996 -21264 0
 21260  21261 -21262  996 -21265 0

c  0-1 --> -1
c    (-b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧ -p_996) -> ( b^{166, 7}_2 ∧ -b^{166, 7}_1 ∧  b^{166, 7}_0)
c  in CNF:
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨  b^{166, 7}_2
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_1
c     b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨  b^{166, 7}_0
c  in DIMACS:
 21260  21261  21262  996  21263 0
 21260  21261  21262  996 -21264 0
 21260  21261  21262  996  21265 0

c  -1-1 --> -2
c    ( b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧  b^{166, 6}_0 ∧ -p_996) -> ( b^{166, 7}_2 ∧  b^{166, 7}_1 ∧ -b^{166, 7}_0)
c  in CNF:
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨  b^{166, 7}_2
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨  b^{166, 7}_1
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨  p_996 ∨ -b^{166, 7}_0
c  in DIMACS:
-21260  21261 -21262  996  21263 0
-21260  21261 -21262  996  21264 0
-21260  21261 -21262  996 -21265 0

c  -2-1 --> break 
c    ( b^{166, 6}_2 ∧  b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨  b^{166, 6}_0 ∨  p_996 ∨ break
c  in DIMACS:
-21260 -21261  21262  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{166, 6}_2 ∧ -b^{166, 6}_1 ∧ -b^{166, 6}_0 ∧ true) 
c  in CNF:
c    -b^{166, 6}_2 ∨  b^{166, 6}_1 ∨  b^{166, 6}_0 ∨ false 
c  in DIMACS:
-21260  21261  21262  0

c  3 does not represent an automaton state.
c    -(-b^{166, 6}_2 ∧  b^{166, 6}_1 ∧  b^{166, 6}_0 ∧ true) 
c  in CNF:
c     b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ false 
c  in DIMACS:
 21260 -21261 -21262  0
c  -3 does not represent an automaton state.
c    -( b^{166, 6}_2 ∧  b^{166, 6}_1 ∧  b^{166, 6}_0 ∧ true) 
c  in CNF:
c    -b^{166, 6}_2 ∨ -b^{166, 6}_1 ∨ -b^{166, 6}_0 ∨ false 
c  in DIMACS:
-21260 -21261 -21262  0

c INIT for k = 167
c    -b^{167, 1}_2
c    -b^{167, 1}_1
c    -b^{167, 1}_0
c  in DIMACS:
-21266 0
-21267 0
-21268 0

c Transitions for k = 167
c i = 1
c  -2+1 --> -1
c    ( b^{167, 1}_2 ∧  b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧  p_167) -> ( b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0)
c  in CNF:
c    -b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨  b^{167, 2}_2
c    -b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_1
c    -b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨  b^{167, 2}_0
c  in DIMACS:
-21266 -21267  21268 -167  21269 0
-21266 -21267  21268 -167 -21270 0
-21266 -21267  21268 -167  21271 0

c  -1+1 --> 0
c    ( b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧  b^{167, 1}_0 ∧  p_167) -> (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧ -b^{167, 2}_0)
c  in CNF:
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_2
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_1
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_0
c  in DIMACS:
-21266  21267 -21268 -167 -21269 0
-21266  21267 -21268 -167 -21270 0
-21266  21267 -21268 -167 -21271 0

c  0+1 --> 1
c    (-b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧  p_167) -> (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0)
c  in CNF:
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_2
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_1
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨  b^{167, 2}_0
c  in DIMACS:
 21266  21267  21268 -167 -21269 0
 21266  21267  21268 -167 -21270 0
 21266  21267  21268 -167  21271 0

c  1+1 --> 2
c    (-b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧  b^{167, 1}_0 ∧  p_167) -> (-b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0)
c  in CNF:
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_2
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨  b^{167, 2}_1
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ -p_167 ∨ -b^{167, 2}_0
c  in DIMACS:
 21266  21267 -21268 -167 -21269 0
 21266  21267 -21268 -167  21270 0
 21266  21267 -21268 -167 -21271 0

c  2+1 --> break 
c    (-b^{167, 1}_2 ∧  b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧  p_167) -> break
c  in CNF:
c     b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ -p_167 ∨ break
c  in DIMACS:
 21266 -21267  21268 -167 1162 0


c  2-1 --> 1
c    (-b^{167, 1}_2 ∧  b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧ -p_167) -> (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0)
c  in CNF:
c     b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_2
c     b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_1
c     b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨  b^{167, 2}_0
c  in DIMACS:
 21266 -21267  21268  167 -21269 0
 21266 -21267  21268  167 -21270 0
 21266 -21267  21268  167  21271 0

c  1-1 --> 0
c    (-b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧  b^{167, 1}_0 ∧ -p_167) -> (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧ -b^{167, 2}_0)
c  in CNF:
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_2
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_1
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_0
c  in DIMACS:
 21266  21267 -21268  167 -21269 0
 21266  21267 -21268  167 -21270 0
 21266  21267 -21268  167 -21271 0

c  0-1 --> -1
c    (-b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧ -p_167) -> ( b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0)
c  in CNF:
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨  b^{167, 2}_2
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_1
c     b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨  b^{167, 2}_0
c  in DIMACS:
 21266  21267  21268  167  21269 0
 21266  21267  21268  167 -21270 0
 21266  21267  21268  167  21271 0

c  -1-1 --> -2
c    ( b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧  b^{167, 1}_0 ∧ -p_167) -> ( b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0)
c  in CNF:
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨  b^{167, 2}_2
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨  b^{167, 2}_1
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨  p_167 ∨ -b^{167, 2}_0
c  in DIMACS:
-21266  21267 -21268  167  21269 0
-21266  21267 -21268  167  21270 0
-21266  21267 -21268  167 -21271 0

c  -2-1 --> break 
c    ( b^{167, 1}_2 ∧  b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧ -p_167) -> break
c  in CNF:
c    -b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨  b^{167, 1}_0 ∨  p_167 ∨ break
c  in DIMACS:
-21266 -21267  21268  167 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 1}_2 ∧ -b^{167, 1}_1 ∧ -b^{167, 1}_0 ∧ true) 
c  in CNF:
c    -b^{167, 1}_2 ∨  b^{167, 1}_1 ∨  b^{167, 1}_0 ∨ false 
c  in DIMACS:
-21266  21267  21268  0

c  3 does not represent an automaton state.
c    -(-b^{167, 1}_2 ∧  b^{167, 1}_1 ∧  b^{167, 1}_0 ∧ true) 
c  in CNF:
c     b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ false 
c  in DIMACS:
 21266 -21267 -21268  0
c  -3 does not represent an automaton state.
c    -( b^{167, 1}_2 ∧  b^{167, 1}_1 ∧  b^{167, 1}_0 ∧ true) 
c  in CNF:
c    -b^{167, 1}_2 ∨ -b^{167, 1}_1 ∨ -b^{167, 1}_0 ∨ false 
c  in DIMACS:
-21266 -21267 -21268  0

c i = 2
c  -2+1 --> -1
c    ( b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧  p_334) -> ( b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0)
c  in CNF:
c    -b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨  b^{167, 3}_2
c    -b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_1
c    -b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨  b^{167, 3}_0
c  in DIMACS:
-21269 -21270  21271 -334  21272 0
-21269 -21270  21271 -334 -21273 0
-21269 -21270  21271 -334  21274 0

c  -1+1 --> 0
c    ( b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0 ∧  p_334) -> (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧ -b^{167, 3}_0)
c  in CNF:
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_2
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_1
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_0
c  in DIMACS:
-21269  21270 -21271 -334 -21272 0
-21269  21270 -21271 -334 -21273 0
-21269  21270 -21271 -334 -21274 0

c  0+1 --> 1
c    (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧  p_334) -> (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0)
c  in CNF:
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_2
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_1
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨  b^{167, 3}_0
c  in DIMACS:
 21269  21270  21271 -334 -21272 0
 21269  21270  21271 -334 -21273 0
 21269  21270  21271 -334  21274 0

c  1+1 --> 2
c    (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0 ∧  p_334) -> (-b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0)
c  in CNF:
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_2
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨  b^{167, 3}_1
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ -p_334 ∨ -b^{167, 3}_0
c  in DIMACS:
 21269  21270 -21271 -334 -21272 0
 21269  21270 -21271 -334  21273 0
 21269  21270 -21271 -334 -21274 0

c  2+1 --> break 
c    (-b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧  p_334) -> break
c  in CNF:
c     b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ -p_334 ∨ break
c  in DIMACS:
 21269 -21270  21271 -334 1162 0


c  2-1 --> 1
c    (-b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧ -p_334) -> (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0)
c  in CNF:
c     b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_2
c     b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_1
c     b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨  b^{167, 3}_0
c  in DIMACS:
 21269 -21270  21271  334 -21272 0
 21269 -21270  21271  334 -21273 0
 21269 -21270  21271  334  21274 0

c  1-1 --> 0
c    (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0 ∧ -p_334) -> (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧ -b^{167, 3}_0)
c  in CNF:
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_2
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_1
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_0
c  in DIMACS:
 21269  21270 -21271  334 -21272 0
 21269  21270 -21271  334 -21273 0
 21269  21270 -21271  334 -21274 0

c  0-1 --> -1
c    (-b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧ -p_334) -> ( b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0)
c  in CNF:
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨  b^{167, 3}_2
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_1
c     b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨  b^{167, 3}_0
c  in DIMACS:
 21269  21270  21271  334  21272 0
 21269  21270  21271  334 -21273 0
 21269  21270  21271  334  21274 0

c  -1-1 --> -2
c    ( b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧  b^{167, 2}_0 ∧ -p_334) -> ( b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0)
c  in CNF:
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨  b^{167, 3}_2
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨  b^{167, 3}_1
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨  p_334 ∨ -b^{167, 3}_0
c  in DIMACS:
-21269  21270 -21271  334  21272 0
-21269  21270 -21271  334  21273 0
-21269  21270 -21271  334 -21274 0

c  -2-1 --> break 
c    ( b^{167, 2}_2 ∧  b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧ -p_334) -> break
c  in CNF:
c    -b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨  b^{167, 2}_0 ∨  p_334 ∨ break
c  in DIMACS:
-21269 -21270  21271  334 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 2}_2 ∧ -b^{167, 2}_1 ∧ -b^{167, 2}_0 ∧ true) 
c  in CNF:
c    -b^{167, 2}_2 ∨  b^{167, 2}_1 ∨  b^{167, 2}_0 ∨ false 
c  in DIMACS:
-21269  21270  21271  0

c  3 does not represent an automaton state.
c    -(-b^{167, 2}_2 ∧  b^{167, 2}_1 ∧  b^{167, 2}_0 ∧ true) 
c  in CNF:
c     b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ false 
c  in DIMACS:
 21269 -21270 -21271  0
c  -3 does not represent an automaton state.
c    -( b^{167, 2}_2 ∧  b^{167, 2}_1 ∧  b^{167, 2}_0 ∧ true) 
c  in CNF:
c    -b^{167, 2}_2 ∨ -b^{167, 2}_1 ∨ -b^{167, 2}_0 ∨ false 
c  in DIMACS:
-21269 -21270 -21271  0

c i = 3
c  -2+1 --> -1
c    ( b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧  p_501) -> ( b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0)
c  in CNF:
c    -b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨  b^{167, 4}_2
c    -b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_1
c    -b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨  b^{167, 4}_0
c  in DIMACS:
-21272 -21273  21274 -501  21275 0
-21272 -21273  21274 -501 -21276 0
-21272 -21273  21274 -501  21277 0

c  -1+1 --> 0
c    ( b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0 ∧  p_501) -> (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧ -b^{167, 4}_0)
c  in CNF:
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_2
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_1
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_0
c  in DIMACS:
-21272  21273 -21274 -501 -21275 0
-21272  21273 -21274 -501 -21276 0
-21272  21273 -21274 -501 -21277 0

c  0+1 --> 1
c    (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧  p_501) -> (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0)
c  in CNF:
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_2
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_1
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨  b^{167, 4}_0
c  in DIMACS:
 21272  21273  21274 -501 -21275 0
 21272  21273  21274 -501 -21276 0
 21272  21273  21274 -501  21277 0

c  1+1 --> 2
c    (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0 ∧  p_501) -> (-b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0)
c  in CNF:
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_2
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨  b^{167, 4}_1
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ -p_501 ∨ -b^{167, 4}_0
c  in DIMACS:
 21272  21273 -21274 -501 -21275 0
 21272  21273 -21274 -501  21276 0
 21272  21273 -21274 -501 -21277 0

c  2+1 --> break 
c    (-b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧  p_501) -> break
c  in CNF:
c     b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ -p_501 ∨ break
c  in DIMACS:
 21272 -21273  21274 -501 1162 0


c  2-1 --> 1
c    (-b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧ -p_501) -> (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0)
c  in CNF:
c     b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_2
c     b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_1
c     b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨  b^{167, 4}_0
c  in DIMACS:
 21272 -21273  21274  501 -21275 0
 21272 -21273  21274  501 -21276 0
 21272 -21273  21274  501  21277 0

c  1-1 --> 0
c    (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0 ∧ -p_501) -> (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧ -b^{167, 4}_0)
c  in CNF:
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_2
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_1
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_0
c  in DIMACS:
 21272  21273 -21274  501 -21275 0
 21272  21273 -21274  501 -21276 0
 21272  21273 -21274  501 -21277 0

c  0-1 --> -1
c    (-b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧ -p_501) -> ( b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0)
c  in CNF:
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨  b^{167, 4}_2
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_1
c     b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨  b^{167, 4}_0
c  in DIMACS:
 21272  21273  21274  501  21275 0
 21272  21273  21274  501 -21276 0
 21272  21273  21274  501  21277 0

c  -1-1 --> -2
c    ( b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧  b^{167, 3}_0 ∧ -p_501) -> ( b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0)
c  in CNF:
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨  b^{167, 4}_2
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨  b^{167, 4}_1
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨  p_501 ∨ -b^{167, 4}_0
c  in DIMACS:
-21272  21273 -21274  501  21275 0
-21272  21273 -21274  501  21276 0
-21272  21273 -21274  501 -21277 0

c  -2-1 --> break 
c    ( b^{167, 3}_2 ∧  b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧ -p_501) -> break
c  in CNF:
c    -b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨  b^{167, 3}_0 ∨  p_501 ∨ break
c  in DIMACS:
-21272 -21273  21274  501 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 3}_2 ∧ -b^{167, 3}_1 ∧ -b^{167, 3}_0 ∧ true) 
c  in CNF:
c    -b^{167, 3}_2 ∨  b^{167, 3}_1 ∨  b^{167, 3}_0 ∨ false 
c  in DIMACS:
-21272  21273  21274  0

c  3 does not represent an automaton state.
c    -(-b^{167, 3}_2 ∧  b^{167, 3}_1 ∧  b^{167, 3}_0 ∧ true) 
c  in CNF:
c     b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ false 
c  in DIMACS:
 21272 -21273 -21274  0
c  -3 does not represent an automaton state.
c    -( b^{167, 3}_2 ∧  b^{167, 3}_1 ∧  b^{167, 3}_0 ∧ true) 
c  in CNF:
c    -b^{167, 3}_2 ∨ -b^{167, 3}_1 ∨ -b^{167, 3}_0 ∨ false 
c  in DIMACS:
-21272 -21273 -21274  0

c i = 4
c  -2+1 --> -1
c    ( b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧  p_668) -> ( b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0)
c  in CNF:
c    -b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨  b^{167, 5}_2
c    -b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_1
c    -b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨  b^{167, 5}_0
c  in DIMACS:
-21275 -21276  21277 -668  21278 0
-21275 -21276  21277 -668 -21279 0
-21275 -21276  21277 -668  21280 0

c  -1+1 --> 0
c    ( b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0 ∧  p_668) -> (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧ -b^{167, 5}_0)
c  in CNF:
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_2
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_1
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_0
c  in DIMACS:
-21275  21276 -21277 -668 -21278 0
-21275  21276 -21277 -668 -21279 0
-21275  21276 -21277 -668 -21280 0

c  0+1 --> 1
c    (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧  p_668) -> (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0)
c  in CNF:
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_2
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_1
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨  b^{167, 5}_0
c  in DIMACS:
 21275  21276  21277 -668 -21278 0
 21275  21276  21277 -668 -21279 0
 21275  21276  21277 -668  21280 0

c  1+1 --> 2
c    (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0 ∧  p_668) -> (-b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0)
c  in CNF:
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_2
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨  b^{167, 5}_1
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ -p_668 ∨ -b^{167, 5}_0
c  in DIMACS:
 21275  21276 -21277 -668 -21278 0
 21275  21276 -21277 -668  21279 0
 21275  21276 -21277 -668 -21280 0

c  2+1 --> break 
c    (-b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧  p_668) -> break
c  in CNF:
c     b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ -p_668 ∨ break
c  in DIMACS:
 21275 -21276  21277 -668 1162 0


c  2-1 --> 1
c    (-b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧ -p_668) -> (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0)
c  in CNF:
c     b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_2
c     b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_1
c     b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨  b^{167, 5}_0
c  in DIMACS:
 21275 -21276  21277  668 -21278 0
 21275 -21276  21277  668 -21279 0
 21275 -21276  21277  668  21280 0

c  1-1 --> 0
c    (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0 ∧ -p_668) -> (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧ -b^{167, 5}_0)
c  in CNF:
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_2
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_1
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_0
c  in DIMACS:
 21275  21276 -21277  668 -21278 0
 21275  21276 -21277  668 -21279 0
 21275  21276 -21277  668 -21280 0

c  0-1 --> -1
c    (-b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧ -p_668) -> ( b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0)
c  in CNF:
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨  b^{167, 5}_2
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_1
c     b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨  b^{167, 5}_0
c  in DIMACS:
 21275  21276  21277  668  21278 0
 21275  21276  21277  668 -21279 0
 21275  21276  21277  668  21280 0

c  -1-1 --> -2
c    ( b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧  b^{167, 4}_0 ∧ -p_668) -> ( b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0)
c  in CNF:
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨  b^{167, 5}_2
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨  b^{167, 5}_1
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨  p_668 ∨ -b^{167, 5}_0
c  in DIMACS:
-21275  21276 -21277  668  21278 0
-21275  21276 -21277  668  21279 0
-21275  21276 -21277  668 -21280 0

c  -2-1 --> break 
c    ( b^{167, 4}_2 ∧  b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧ -p_668) -> break
c  in CNF:
c    -b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨  b^{167, 4}_0 ∨  p_668 ∨ break
c  in DIMACS:
-21275 -21276  21277  668 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 4}_2 ∧ -b^{167, 4}_1 ∧ -b^{167, 4}_0 ∧ true) 
c  in CNF:
c    -b^{167, 4}_2 ∨  b^{167, 4}_1 ∨  b^{167, 4}_0 ∨ false 
c  in DIMACS:
-21275  21276  21277  0

c  3 does not represent an automaton state.
c    -(-b^{167, 4}_2 ∧  b^{167, 4}_1 ∧  b^{167, 4}_0 ∧ true) 
c  in CNF:
c     b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ false 
c  in DIMACS:
 21275 -21276 -21277  0
c  -3 does not represent an automaton state.
c    -( b^{167, 4}_2 ∧  b^{167, 4}_1 ∧  b^{167, 4}_0 ∧ true) 
c  in CNF:
c    -b^{167, 4}_2 ∨ -b^{167, 4}_1 ∨ -b^{167, 4}_0 ∨ false 
c  in DIMACS:
-21275 -21276 -21277  0

c i = 5
c  -2+1 --> -1
c    ( b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧  p_835) -> ( b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0)
c  in CNF:
c    -b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨  b^{167, 6}_2
c    -b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_1
c    -b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨  b^{167, 6}_0
c  in DIMACS:
-21278 -21279  21280 -835  21281 0
-21278 -21279  21280 -835 -21282 0
-21278 -21279  21280 -835  21283 0

c  -1+1 --> 0
c    ( b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0 ∧  p_835) -> (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧ -b^{167, 6}_0)
c  in CNF:
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_2
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_1
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_0
c  in DIMACS:
-21278  21279 -21280 -835 -21281 0
-21278  21279 -21280 -835 -21282 0
-21278  21279 -21280 -835 -21283 0

c  0+1 --> 1
c    (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧  p_835) -> (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0)
c  in CNF:
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_2
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_1
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨  b^{167, 6}_0
c  in DIMACS:
 21278  21279  21280 -835 -21281 0
 21278  21279  21280 -835 -21282 0
 21278  21279  21280 -835  21283 0

c  1+1 --> 2
c    (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0 ∧  p_835) -> (-b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0)
c  in CNF:
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_2
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨  b^{167, 6}_1
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ -p_835 ∨ -b^{167, 6}_0
c  in DIMACS:
 21278  21279 -21280 -835 -21281 0
 21278  21279 -21280 -835  21282 0
 21278  21279 -21280 -835 -21283 0

c  2+1 --> break 
c    (-b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧  p_835) -> break
c  in CNF:
c     b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ -p_835 ∨ break
c  in DIMACS:
 21278 -21279  21280 -835 1162 0


c  2-1 --> 1
c    (-b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧ -p_835) -> (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0)
c  in CNF:
c     b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_2
c     b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_1
c     b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨  b^{167, 6}_0
c  in DIMACS:
 21278 -21279  21280  835 -21281 0
 21278 -21279  21280  835 -21282 0
 21278 -21279  21280  835  21283 0

c  1-1 --> 0
c    (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0 ∧ -p_835) -> (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧ -b^{167, 6}_0)
c  in CNF:
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_2
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_1
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_0
c  in DIMACS:
 21278  21279 -21280  835 -21281 0
 21278  21279 -21280  835 -21282 0
 21278  21279 -21280  835 -21283 0

c  0-1 --> -1
c    (-b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧ -p_835) -> ( b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0)
c  in CNF:
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨  b^{167, 6}_2
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_1
c     b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨  b^{167, 6}_0
c  in DIMACS:
 21278  21279  21280  835  21281 0
 21278  21279  21280  835 -21282 0
 21278  21279  21280  835  21283 0

c  -1-1 --> -2
c    ( b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧  b^{167, 5}_0 ∧ -p_835) -> ( b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0)
c  in CNF:
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨  b^{167, 6}_2
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨  b^{167, 6}_1
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨  p_835 ∨ -b^{167, 6}_0
c  in DIMACS:
-21278  21279 -21280  835  21281 0
-21278  21279 -21280  835  21282 0
-21278  21279 -21280  835 -21283 0

c  -2-1 --> break 
c    ( b^{167, 5}_2 ∧  b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧ -p_835) -> break
c  in CNF:
c    -b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨  b^{167, 5}_0 ∨  p_835 ∨ break
c  in DIMACS:
-21278 -21279  21280  835 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 5}_2 ∧ -b^{167, 5}_1 ∧ -b^{167, 5}_0 ∧ true) 
c  in CNF:
c    -b^{167, 5}_2 ∨  b^{167, 5}_1 ∨  b^{167, 5}_0 ∨ false 
c  in DIMACS:
-21278  21279  21280  0

c  3 does not represent an automaton state.
c    -(-b^{167, 5}_2 ∧  b^{167, 5}_1 ∧  b^{167, 5}_0 ∧ true) 
c  in CNF:
c     b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ false 
c  in DIMACS:
 21278 -21279 -21280  0
c  -3 does not represent an automaton state.
c    -( b^{167, 5}_2 ∧  b^{167, 5}_1 ∧  b^{167, 5}_0 ∧ true) 
c  in CNF:
c    -b^{167, 5}_2 ∨ -b^{167, 5}_1 ∨ -b^{167, 5}_0 ∨ false 
c  in DIMACS:
-21278 -21279 -21280  0

c i = 6
c  -2+1 --> -1
c    ( b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧  p_1002) -> ( b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧  b^{167, 7}_0)
c  in CNF:
c    -b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨  b^{167, 7}_2
c    -b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_1
c    -b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨  b^{167, 7}_0
c  in DIMACS:
-21281 -21282  21283 -1002  21284 0
-21281 -21282  21283 -1002 -21285 0
-21281 -21282  21283 -1002  21286 0

c  -1+1 --> 0
c    ( b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0 ∧  p_1002) -> (-b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧ -b^{167, 7}_0)
c  in CNF:
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_2
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_1
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_0
c  in DIMACS:
-21281  21282 -21283 -1002 -21284 0
-21281  21282 -21283 -1002 -21285 0
-21281  21282 -21283 -1002 -21286 0

c  0+1 --> 1
c    (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧  p_1002) -> (-b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧  b^{167, 7}_0)
c  in CNF:
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_2
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_1
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨  b^{167, 7}_0
c  in DIMACS:
 21281  21282  21283 -1002 -21284 0
 21281  21282  21283 -1002 -21285 0
 21281  21282  21283 -1002  21286 0

c  1+1 --> 2
c    (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0 ∧  p_1002) -> (-b^{167, 7}_2 ∧  b^{167, 7}_1 ∧ -b^{167, 7}_0)
c  in CNF:
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_2
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨  b^{167, 7}_1
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ -p_1002 ∨ -b^{167, 7}_0
c  in DIMACS:
 21281  21282 -21283 -1002 -21284 0
 21281  21282 -21283 -1002  21285 0
 21281  21282 -21283 -1002 -21286 0

c  2+1 --> break 
c    (-b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 21281 -21282  21283 -1002 1162 0


c  2-1 --> 1
c    (-b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧ -p_1002) -> (-b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧  b^{167, 7}_0)
c  in CNF:
c     b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_2
c     b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_1
c     b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨  b^{167, 7}_0
c  in DIMACS:
 21281 -21282  21283  1002 -21284 0
 21281 -21282  21283  1002 -21285 0
 21281 -21282  21283  1002  21286 0

c  1-1 --> 0
c    (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0 ∧ -p_1002) -> (-b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧ -b^{167, 7}_0)
c  in CNF:
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_2
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_1
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_0
c  in DIMACS:
 21281  21282 -21283  1002 -21284 0
 21281  21282 -21283  1002 -21285 0
 21281  21282 -21283  1002 -21286 0

c  0-1 --> -1
c    (-b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧ -p_1002) -> ( b^{167, 7}_2 ∧ -b^{167, 7}_1 ∧  b^{167, 7}_0)
c  in CNF:
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨  b^{167, 7}_2
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_1
c     b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨  b^{167, 7}_0
c  in DIMACS:
 21281  21282  21283  1002  21284 0
 21281  21282  21283  1002 -21285 0
 21281  21282  21283  1002  21286 0

c  -1-1 --> -2
c    ( b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧  b^{167, 6}_0 ∧ -p_1002) -> ( b^{167, 7}_2 ∧  b^{167, 7}_1 ∧ -b^{167, 7}_0)
c  in CNF:
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨  b^{167, 7}_2
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨  b^{167, 7}_1
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨  p_1002 ∨ -b^{167, 7}_0
c  in DIMACS:
-21281  21282 -21283  1002  21284 0
-21281  21282 -21283  1002  21285 0
-21281  21282 -21283  1002 -21286 0

c  -2-1 --> break 
c    ( b^{167, 6}_2 ∧  b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨  b^{167, 6}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-21281 -21282  21283  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{167, 6}_2 ∧ -b^{167, 6}_1 ∧ -b^{167, 6}_0 ∧ true) 
c  in CNF:
c    -b^{167, 6}_2 ∨  b^{167, 6}_1 ∨  b^{167, 6}_0 ∨ false 
c  in DIMACS:
-21281  21282  21283  0

c  3 does not represent an automaton state.
c    -(-b^{167, 6}_2 ∧  b^{167, 6}_1 ∧  b^{167, 6}_0 ∧ true) 
c  in CNF:
c     b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ false 
c  in DIMACS:
 21281 -21282 -21283  0
c  -3 does not represent an automaton state.
c    -( b^{167, 6}_2 ∧  b^{167, 6}_1 ∧  b^{167, 6}_0 ∧ true) 
c  in CNF:
c    -b^{167, 6}_2 ∨ -b^{167, 6}_1 ∨ -b^{167, 6}_0 ∨ false 
c  in DIMACS:
-21281 -21282 -21283  0

c INIT for k = 168
c    -b^{168, 1}_2
c    -b^{168, 1}_1
c    -b^{168, 1}_0
c  in DIMACS:
-21287 0
-21288 0
-21289 0

c Transitions for k = 168
c i = 1
c  -2+1 --> -1
c    ( b^{168, 1}_2 ∧  b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧  p_168) -> ( b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0)
c  in CNF:
c    -b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨  b^{168, 2}_2
c    -b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_1
c    -b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨  b^{168, 2}_0
c  in DIMACS:
-21287 -21288  21289 -168  21290 0
-21287 -21288  21289 -168 -21291 0
-21287 -21288  21289 -168  21292 0

c  -1+1 --> 0
c    ( b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧  b^{168, 1}_0 ∧  p_168) -> (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧ -b^{168, 2}_0)
c  in CNF:
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_2
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_1
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_0
c  in DIMACS:
-21287  21288 -21289 -168 -21290 0
-21287  21288 -21289 -168 -21291 0
-21287  21288 -21289 -168 -21292 0

c  0+1 --> 1
c    (-b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧  p_168) -> (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0)
c  in CNF:
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_2
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_1
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨  b^{168, 2}_0
c  in DIMACS:
 21287  21288  21289 -168 -21290 0
 21287  21288  21289 -168 -21291 0
 21287  21288  21289 -168  21292 0

c  1+1 --> 2
c    (-b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧  b^{168, 1}_0 ∧  p_168) -> (-b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0)
c  in CNF:
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_2
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨  b^{168, 2}_1
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ -p_168 ∨ -b^{168, 2}_0
c  in DIMACS:
 21287  21288 -21289 -168 -21290 0
 21287  21288 -21289 -168  21291 0
 21287  21288 -21289 -168 -21292 0

c  2+1 --> break 
c    (-b^{168, 1}_2 ∧  b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧  p_168) -> break
c  in CNF:
c     b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ -p_168 ∨ break
c  in DIMACS:
 21287 -21288  21289 -168 1162 0


c  2-1 --> 1
c    (-b^{168, 1}_2 ∧  b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧ -p_168) -> (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0)
c  in CNF:
c     b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_2
c     b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_1
c     b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨  b^{168, 2}_0
c  in DIMACS:
 21287 -21288  21289  168 -21290 0
 21287 -21288  21289  168 -21291 0
 21287 -21288  21289  168  21292 0

c  1-1 --> 0
c    (-b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧  b^{168, 1}_0 ∧ -p_168) -> (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧ -b^{168, 2}_0)
c  in CNF:
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_2
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_1
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_0
c  in DIMACS:
 21287  21288 -21289  168 -21290 0
 21287  21288 -21289  168 -21291 0
 21287  21288 -21289  168 -21292 0

c  0-1 --> -1
c    (-b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧ -p_168) -> ( b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0)
c  in CNF:
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨  b^{168, 2}_2
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_1
c     b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨  b^{168, 2}_0
c  in DIMACS:
 21287  21288  21289  168  21290 0
 21287  21288  21289  168 -21291 0
 21287  21288  21289  168  21292 0

c  -1-1 --> -2
c    ( b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧  b^{168, 1}_0 ∧ -p_168) -> ( b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0)
c  in CNF:
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨  b^{168, 2}_2
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨  b^{168, 2}_1
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨  p_168 ∨ -b^{168, 2}_0
c  in DIMACS:
-21287  21288 -21289  168  21290 0
-21287  21288 -21289  168  21291 0
-21287  21288 -21289  168 -21292 0

c  -2-1 --> break 
c    ( b^{168, 1}_2 ∧  b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧ -p_168) -> break
c  in CNF:
c    -b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨  b^{168, 1}_0 ∨  p_168 ∨ break
c  in DIMACS:
-21287 -21288  21289  168 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 1}_2 ∧ -b^{168, 1}_1 ∧ -b^{168, 1}_0 ∧ true) 
c  in CNF:
c    -b^{168, 1}_2 ∨  b^{168, 1}_1 ∨  b^{168, 1}_0 ∨ false 
c  in DIMACS:
-21287  21288  21289  0

c  3 does not represent an automaton state.
c    -(-b^{168, 1}_2 ∧  b^{168, 1}_1 ∧  b^{168, 1}_0 ∧ true) 
c  in CNF:
c     b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ false 
c  in DIMACS:
 21287 -21288 -21289  0
c  -3 does not represent an automaton state.
c    -( b^{168, 1}_2 ∧  b^{168, 1}_1 ∧  b^{168, 1}_0 ∧ true) 
c  in CNF:
c    -b^{168, 1}_2 ∨ -b^{168, 1}_1 ∨ -b^{168, 1}_0 ∨ false 
c  in DIMACS:
-21287 -21288 -21289  0

c i = 2
c  -2+1 --> -1
c    ( b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧  p_336) -> ( b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0)
c  in CNF:
c    -b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨  b^{168, 3}_2
c    -b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_1
c    -b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨  b^{168, 3}_0
c  in DIMACS:
-21290 -21291  21292 -336  21293 0
-21290 -21291  21292 -336 -21294 0
-21290 -21291  21292 -336  21295 0

c  -1+1 --> 0
c    ( b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0 ∧  p_336) -> (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧ -b^{168, 3}_0)
c  in CNF:
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_2
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_1
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_0
c  in DIMACS:
-21290  21291 -21292 -336 -21293 0
-21290  21291 -21292 -336 -21294 0
-21290  21291 -21292 -336 -21295 0

c  0+1 --> 1
c    (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧  p_336) -> (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0)
c  in CNF:
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_2
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_1
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨  b^{168, 3}_0
c  in DIMACS:
 21290  21291  21292 -336 -21293 0
 21290  21291  21292 -336 -21294 0
 21290  21291  21292 -336  21295 0

c  1+1 --> 2
c    (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0 ∧  p_336) -> (-b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0)
c  in CNF:
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_2
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨  b^{168, 3}_1
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ -p_336 ∨ -b^{168, 3}_0
c  in DIMACS:
 21290  21291 -21292 -336 -21293 0
 21290  21291 -21292 -336  21294 0
 21290  21291 -21292 -336 -21295 0

c  2+1 --> break 
c    (-b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧  p_336) -> break
c  in CNF:
c     b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 21290 -21291  21292 -336 1162 0


c  2-1 --> 1
c    (-b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧ -p_336) -> (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0)
c  in CNF:
c     b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_2
c     b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_1
c     b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨  b^{168, 3}_0
c  in DIMACS:
 21290 -21291  21292  336 -21293 0
 21290 -21291  21292  336 -21294 0
 21290 -21291  21292  336  21295 0

c  1-1 --> 0
c    (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0 ∧ -p_336) -> (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧ -b^{168, 3}_0)
c  in CNF:
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_2
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_1
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_0
c  in DIMACS:
 21290  21291 -21292  336 -21293 0
 21290  21291 -21292  336 -21294 0
 21290  21291 -21292  336 -21295 0

c  0-1 --> -1
c    (-b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧ -p_336) -> ( b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0)
c  in CNF:
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨  b^{168, 3}_2
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_1
c     b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨  b^{168, 3}_0
c  in DIMACS:
 21290  21291  21292  336  21293 0
 21290  21291  21292  336 -21294 0
 21290  21291  21292  336  21295 0

c  -1-1 --> -2
c    ( b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧  b^{168, 2}_0 ∧ -p_336) -> ( b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0)
c  in CNF:
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨  b^{168, 3}_2
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨  b^{168, 3}_1
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨  p_336 ∨ -b^{168, 3}_0
c  in DIMACS:
-21290  21291 -21292  336  21293 0
-21290  21291 -21292  336  21294 0
-21290  21291 -21292  336 -21295 0

c  -2-1 --> break 
c    ( b^{168, 2}_2 ∧  b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨  b^{168, 2}_0 ∨  p_336 ∨ break
c  in DIMACS:
-21290 -21291  21292  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 2}_2 ∧ -b^{168, 2}_1 ∧ -b^{168, 2}_0 ∧ true) 
c  in CNF:
c    -b^{168, 2}_2 ∨  b^{168, 2}_1 ∨  b^{168, 2}_0 ∨ false 
c  in DIMACS:
-21290  21291  21292  0

c  3 does not represent an automaton state.
c    -(-b^{168, 2}_2 ∧  b^{168, 2}_1 ∧  b^{168, 2}_0 ∧ true) 
c  in CNF:
c     b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ false 
c  in DIMACS:
 21290 -21291 -21292  0
c  -3 does not represent an automaton state.
c    -( b^{168, 2}_2 ∧  b^{168, 2}_1 ∧  b^{168, 2}_0 ∧ true) 
c  in CNF:
c    -b^{168, 2}_2 ∨ -b^{168, 2}_1 ∨ -b^{168, 2}_0 ∨ false 
c  in DIMACS:
-21290 -21291 -21292  0

c i = 3
c  -2+1 --> -1
c    ( b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧  p_504) -> ( b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0)
c  in CNF:
c    -b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨  b^{168, 4}_2
c    -b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_1
c    -b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨  b^{168, 4}_0
c  in DIMACS:
-21293 -21294  21295 -504  21296 0
-21293 -21294  21295 -504 -21297 0
-21293 -21294  21295 -504  21298 0

c  -1+1 --> 0
c    ( b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0 ∧  p_504) -> (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧ -b^{168, 4}_0)
c  in CNF:
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_2
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_1
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_0
c  in DIMACS:
-21293  21294 -21295 -504 -21296 0
-21293  21294 -21295 -504 -21297 0
-21293  21294 -21295 -504 -21298 0

c  0+1 --> 1
c    (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧  p_504) -> (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0)
c  in CNF:
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_2
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_1
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨  b^{168, 4}_0
c  in DIMACS:
 21293  21294  21295 -504 -21296 0
 21293  21294  21295 -504 -21297 0
 21293  21294  21295 -504  21298 0

c  1+1 --> 2
c    (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0 ∧  p_504) -> (-b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0)
c  in CNF:
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_2
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨  b^{168, 4}_1
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ -p_504 ∨ -b^{168, 4}_0
c  in DIMACS:
 21293  21294 -21295 -504 -21296 0
 21293  21294 -21295 -504  21297 0
 21293  21294 -21295 -504 -21298 0

c  2+1 --> break 
c    (-b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧  p_504) -> break
c  in CNF:
c     b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 21293 -21294  21295 -504 1162 0


c  2-1 --> 1
c    (-b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧ -p_504) -> (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0)
c  in CNF:
c     b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_2
c     b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_1
c     b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨  b^{168, 4}_0
c  in DIMACS:
 21293 -21294  21295  504 -21296 0
 21293 -21294  21295  504 -21297 0
 21293 -21294  21295  504  21298 0

c  1-1 --> 0
c    (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0 ∧ -p_504) -> (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧ -b^{168, 4}_0)
c  in CNF:
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_2
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_1
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_0
c  in DIMACS:
 21293  21294 -21295  504 -21296 0
 21293  21294 -21295  504 -21297 0
 21293  21294 -21295  504 -21298 0

c  0-1 --> -1
c    (-b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧ -p_504) -> ( b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0)
c  in CNF:
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨  b^{168, 4}_2
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_1
c     b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨  b^{168, 4}_0
c  in DIMACS:
 21293  21294  21295  504  21296 0
 21293  21294  21295  504 -21297 0
 21293  21294  21295  504  21298 0

c  -1-1 --> -2
c    ( b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧  b^{168, 3}_0 ∧ -p_504) -> ( b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0)
c  in CNF:
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨  b^{168, 4}_2
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨  b^{168, 4}_1
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨  p_504 ∨ -b^{168, 4}_0
c  in DIMACS:
-21293  21294 -21295  504  21296 0
-21293  21294 -21295  504  21297 0
-21293  21294 -21295  504 -21298 0

c  -2-1 --> break 
c    ( b^{168, 3}_2 ∧  b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨  b^{168, 3}_0 ∨  p_504 ∨ break
c  in DIMACS:
-21293 -21294  21295  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 3}_2 ∧ -b^{168, 3}_1 ∧ -b^{168, 3}_0 ∧ true) 
c  in CNF:
c    -b^{168, 3}_2 ∨  b^{168, 3}_1 ∨  b^{168, 3}_0 ∨ false 
c  in DIMACS:
-21293  21294  21295  0

c  3 does not represent an automaton state.
c    -(-b^{168, 3}_2 ∧  b^{168, 3}_1 ∧  b^{168, 3}_0 ∧ true) 
c  in CNF:
c     b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ false 
c  in DIMACS:
 21293 -21294 -21295  0
c  -3 does not represent an automaton state.
c    -( b^{168, 3}_2 ∧  b^{168, 3}_1 ∧  b^{168, 3}_0 ∧ true) 
c  in CNF:
c    -b^{168, 3}_2 ∨ -b^{168, 3}_1 ∨ -b^{168, 3}_0 ∨ false 
c  in DIMACS:
-21293 -21294 -21295  0

c i = 4
c  -2+1 --> -1
c    ( b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧  p_672) -> ( b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0)
c  in CNF:
c    -b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨  b^{168, 5}_2
c    -b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_1
c    -b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨  b^{168, 5}_0
c  in DIMACS:
-21296 -21297  21298 -672  21299 0
-21296 -21297  21298 -672 -21300 0
-21296 -21297  21298 -672  21301 0

c  -1+1 --> 0
c    ( b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0 ∧  p_672) -> (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧ -b^{168, 5}_0)
c  in CNF:
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_2
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_1
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_0
c  in DIMACS:
-21296  21297 -21298 -672 -21299 0
-21296  21297 -21298 -672 -21300 0
-21296  21297 -21298 -672 -21301 0

c  0+1 --> 1
c    (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧  p_672) -> (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0)
c  in CNF:
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_2
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_1
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨  b^{168, 5}_0
c  in DIMACS:
 21296  21297  21298 -672 -21299 0
 21296  21297  21298 -672 -21300 0
 21296  21297  21298 -672  21301 0

c  1+1 --> 2
c    (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0 ∧  p_672) -> (-b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0)
c  in CNF:
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_2
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨  b^{168, 5}_1
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ -p_672 ∨ -b^{168, 5}_0
c  in DIMACS:
 21296  21297 -21298 -672 -21299 0
 21296  21297 -21298 -672  21300 0
 21296  21297 -21298 -672 -21301 0

c  2+1 --> break 
c    (-b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧  p_672) -> break
c  in CNF:
c     b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 21296 -21297  21298 -672 1162 0


c  2-1 --> 1
c    (-b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧ -p_672) -> (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0)
c  in CNF:
c     b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_2
c     b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_1
c     b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨  b^{168, 5}_0
c  in DIMACS:
 21296 -21297  21298  672 -21299 0
 21296 -21297  21298  672 -21300 0
 21296 -21297  21298  672  21301 0

c  1-1 --> 0
c    (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0 ∧ -p_672) -> (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧ -b^{168, 5}_0)
c  in CNF:
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_2
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_1
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_0
c  in DIMACS:
 21296  21297 -21298  672 -21299 0
 21296  21297 -21298  672 -21300 0
 21296  21297 -21298  672 -21301 0

c  0-1 --> -1
c    (-b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧ -p_672) -> ( b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0)
c  in CNF:
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨  b^{168, 5}_2
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_1
c     b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨  b^{168, 5}_0
c  in DIMACS:
 21296  21297  21298  672  21299 0
 21296  21297  21298  672 -21300 0
 21296  21297  21298  672  21301 0

c  -1-1 --> -2
c    ( b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧  b^{168, 4}_0 ∧ -p_672) -> ( b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0)
c  in CNF:
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨  b^{168, 5}_2
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨  b^{168, 5}_1
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨  p_672 ∨ -b^{168, 5}_0
c  in DIMACS:
-21296  21297 -21298  672  21299 0
-21296  21297 -21298  672  21300 0
-21296  21297 -21298  672 -21301 0

c  -2-1 --> break 
c    ( b^{168, 4}_2 ∧  b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨  b^{168, 4}_0 ∨  p_672 ∨ break
c  in DIMACS:
-21296 -21297  21298  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 4}_2 ∧ -b^{168, 4}_1 ∧ -b^{168, 4}_0 ∧ true) 
c  in CNF:
c    -b^{168, 4}_2 ∨  b^{168, 4}_1 ∨  b^{168, 4}_0 ∨ false 
c  in DIMACS:
-21296  21297  21298  0

c  3 does not represent an automaton state.
c    -(-b^{168, 4}_2 ∧  b^{168, 4}_1 ∧  b^{168, 4}_0 ∧ true) 
c  in CNF:
c     b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ false 
c  in DIMACS:
 21296 -21297 -21298  0
c  -3 does not represent an automaton state.
c    -( b^{168, 4}_2 ∧  b^{168, 4}_1 ∧  b^{168, 4}_0 ∧ true) 
c  in CNF:
c    -b^{168, 4}_2 ∨ -b^{168, 4}_1 ∨ -b^{168, 4}_0 ∨ false 
c  in DIMACS:
-21296 -21297 -21298  0

c i = 5
c  -2+1 --> -1
c    ( b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧  p_840) -> ( b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0)
c  in CNF:
c    -b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨  b^{168, 6}_2
c    -b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_1
c    -b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨  b^{168, 6}_0
c  in DIMACS:
-21299 -21300  21301 -840  21302 0
-21299 -21300  21301 -840 -21303 0
-21299 -21300  21301 -840  21304 0

c  -1+1 --> 0
c    ( b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0 ∧  p_840) -> (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧ -b^{168, 6}_0)
c  in CNF:
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_2
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_1
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_0
c  in DIMACS:
-21299  21300 -21301 -840 -21302 0
-21299  21300 -21301 -840 -21303 0
-21299  21300 -21301 -840 -21304 0

c  0+1 --> 1
c    (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧  p_840) -> (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0)
c  in CNF:
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_2
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_1
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨  b^{168, 6}_0
c  in DIMACS:
 21299  21300  21301 -840 -21302 0
 21299  21300  21301 -840 -21303 0
 21299  21300  21301 -840  21304 0

c  1+1 --> 2
c    (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0 ∧  p_840) -> (-b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0)
c  in CNF:
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_2
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨  b^{168, 6}_1
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ -p_840 ∨ -b^{168, 6}_0
c  in DIMACS:
 21299  21300 -21301 -840 -21302 0
 21299  21300 -21301 -840  21303 0
 21299  21300 -21301 -840 -21304 0

c  2+1 --> break 
c    (-b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧  p_840) -> break
c  in CNF:
c     b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 21299 -21300  21301 -840 1162 0


c  2-1 --> 1
c    (-b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧ -p_840) -> (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0)
c  in CNF:
c     b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_2
c     b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_1
c     b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨  b^{168, 6}_0
c  in DIMACS:
 21299 -21300  21301  840 -21302 0
 21299 -21300  21301  840 -21303 0
 21299 -21300  21301  840  21304 0

c  1-1 --> 0
c    (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0 ∧ -p_840) -> (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧ -b^{168, 6}_0)
c  in CNF:
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_2
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_1
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_0
c  in DIMACS:
 21299  21300 -21301  840 -21302 0
 21299  21300 -21301  840 -21303 0
 21299  21300 -21301  840 -21304 0

c  0-1 --> -1
c    (-b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧ -p_840) -> ( b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0)
c  in CNF:
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨  b^{168, 6}_2
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_1
c     b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨  b^{168, 6}_0
c  in DIMACS:
 21299  21300  21301  840  21302 0
 21299  21300  21301  840 -21303 0
 21299  21300  21301  840  21304 0

c  -1-1 --> -2
c    ( b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧  b^{168, 5}_0 ∧ -p_840) -> ( b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0)
c  in CNF:
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨  b^{168, 6}_2
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨  b^{168, 6}_1
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨  p_840 ∨ -b^{168, 6}_0
c  in DIMACS:
-21299  21300 -21301  840  21302 0
-21299  21300 -21301  840  21303 0
-21299  21300 -21301  840 -21304 0

c  -2-1 --> break 
c    ( b^{168, 5}_2 ∧  b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨  b^{168, 5}_0 ∨  p_840 ∨ break
c  in DIMACS:
-21299 -21300  21301  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 5}_2 ∧ -b^{168, 5}_1 ∧ -b^{168, 5}_0 ∧ true) 
c  in CNF:
c    -b^{168, 5}_2 ∨  b^{168, 5}_1 ∨  b^{168, 5}_0 ∨ false 
c  in DIMACS:
-21299  21300  21301  0

c  3 does not represent an automaton state.
c    -(-b^{168, 5}_2 ∧  b^{168, 5}_1 ∧  b^{168, 5}_0 ∧ true) 
c  in CNF:
c     b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ false 
c  in DIMACS:
 21299 -21300 -21301  0
c  -3 does not represent an automaton state.
c    -( b^{168, 5}_2 ∧  b^{168, 5}_1 ∧  b^{168, 5}_0 ∧ true) 
c  in CNF:
c    -b^{168, 5}_2 ∨ -b^{168, 5}_1 ∨ -b^{168, 5}_0 ∨ false 
c  in DIMACS:
-21299 -21300 -21301  0

c i = 6
c  -2+1 --> -1
c    ( b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧  p_1008) -> ( b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧  b^{168, 7}_0)
c  in CNF:
c    -b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨  b^{168, 7}_2
c    -b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_1
c    -b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨  b^{168, 7}_0
c  in DIMACS:
-21302 -21303  21304 -1008  21305 0
-21302 -21303  21304 -1008 -21306 0
-21302 -21303  21304 -1008  21307 0

c  -1+1 --> 0
c    ( b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0 ∧  p_1008) -> (-b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧ -b^{168, 7}_0)
c  in CNF:
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_2
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_1
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_0
c  in DIMACS:
-21302  21303 -21304 -1008 -21305 0
-21302  21303 -21304 -1008 -21306 0
-21302  21303 -21304 -1008 -21307 0

c  0+1 --> 1
c    (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧  p_1008) -> (-b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧  b^{168, 7}_0)
c  in CNF:
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_2
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_1
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨  b^{168, 7}_0
c  in DIMACS:
 21302  21303  21304 -1008 -21305 0
 21302  21303  21304 -1008 -21306 0
 21302  21303  21304 -1008  21307 0

c  1+1 --> 2
c    (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0 ∧  p_1008) -> (-b^{168, 7}_2 ∧  b^{168, 7}_1 ∧ -b^{168, 7}_0)
c  in CNF:
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_2
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨  b^{168, 7}_1
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ -p_1008 ∨ -b^{168, 7}_0
c  in DIMACS:
 21302  21303 -21304 -1008 -21305 0
 21302  21303 -21304 -1008  21306 0
 21302  21303 -21304 -1008 -21307 0

c  2+1 --> break 
c    (-b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 21302 -21303  21304 -1008 1162 0


c  2-1 --> 1
c    (-b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧ -p_1008) -> (-b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧  b^{168, 7}_0)
c  in CNF:
c     b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_2
c     b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_1
c     b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨  b^{168, 7}_0
c  in DIMACS:
 21302 -21303  21304  1008 -21305 0
 21302 -21303  21304  1008 -21306 0
 21302 -21303  21304  1008  21307 0

c  1-1 --> 0
c    (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0 ∧ -p_1008) -> (-b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧ -b^{168, 7}_0)
c  in CNF:
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_2
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_1
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_0
c  in DIMACS:
 21302  21303 -21304  1008 -21305 0
 21302  21303 -21304  1008 -21306 0
 21302  21303 -21304  1008 -21307 0

c  0-1 --> -1
c    (-b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧ -p_1008) -> ( b^{168, 7}_2 ∧ -b^{168, 7}_1 ∧  b^{168, 7}_0)
c  in CNF:
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨  b^{168, 7}_2
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_1
c     b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨  b^{168, 7}_0
c  in DIMACS:
 21302  21303  21304  1008  21305 0
 21302  21303  21304  1008 -21306 0
 21302  21303  21304  1008  21307 0

c  -1-1 --> -2
c    ( b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧  b^{168, 6}_0 ∧ -p_1008) -> ( b^{168, 7}_2 ∧  b^{168, 7}_1 ∧ -b^{168, 7}_0)
c  in CNF:
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨  b^{168, 7}_2
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨  b^{168, 7}_1
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨  p_1008 ∨ -b^{168, 7}_0
c  in DIMACS:
-21302  21303 -21304  1008  21305 0
-21302  21303 -21304  1008  21306 0
-21302  21303 -21304  1008 -21307 0

c  -2-1 --> break 
c    ( b^{168, 6}_2 ∧  b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨  b^{168, 6}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-21302 -21303  21304  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{168, 6}_2 ∧ -b^{168, 6}_1 ∧ -b^{168, 6}_0 ∧ true) 
c  in CNF:
c    -b^{168, 6}_2 ∨  b^{168, 6}_1 ∨  b^{168, 6}_0 ∨ false 
c  in DIMACS:
-21302  21303  21304  0

c  3 does not represent an automaton state.
c    -(-b^{168, 6}_2 ∧  b^{168, 6}_1 ∧  b^{168, 6}_0 ∧ true) 
c  in CNF:
c     b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ false 
c  in DIMACS:
 21302 -21303 -21304  0
c  -3 does not represent an automaton state.
c    -( b^{168, 6}_2 ∧  b^{168, 6}_1 ∧  b^{168, 6}_0 ∧ true) 
c  in CNF:
c    -b^{168, 6}_2 ∨ -b^{168, 6}_1 ∨ -b^{168, 6}_0 ∨ false 
c  in DIMACS:
-21302 -21303 -21304  0

c INIT for k = 169
c    -b^{169, 1}_2
c    -b^{169, 1}_1
c    -b^{169, 1}_0
c  in DIMACS:
-21308 0
-21309 0
-21310 0

c Transitions for k = 169
c i = 1
c  -2+1 --> -1
c    ( b^{169, 1}_2 ∧  b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧  p_169) -> ( b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0)
c  in CNF:
c    -b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨  b^{169, 2}_2
c    -b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_1
c    -b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨  b^{169, 2}_0
c  in DIMACS:
-21308 -21309  21310 -169  21311 0
-21308 -21309  21310 -169 -21312 0
-21308 -21309  21310 -169  21313 0

c  -1+1 --> 0
c    ( b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧  b^{169, 1}_0 ∧  p_169) -> (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧ -b^{169, 2}_0)
c  in CNF:
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_2
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_1
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_0
c  in DIMACS:
-21308  21309 -21310 -169 -21311 0
-21308  21309 -21310 -169 -21312 0
-21308  21309 -21310 -169 -21313 0

c  0+1 --> 1
c    (-b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧  p_169) -> (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0)
c  in CNF:
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_2
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_1
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨  b^{169, 2}_0
c  in DIMACS:
 21308  21309  21310 -169 -21311 0
 21308  21309  21310 -169 -21312 0
 21308  21309  21310 -169  21313 0

c  1+1 --> 2
c    (-b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧  b^{169, 1}_0 ∧  p_169) -> (-b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0)
c  in CNF:
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_2
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨  b^{169, 2}_1
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ -p_169 ∨ -b^{169, 2}_0
c  in DIMACS:
 21308  21309 -21310 -169 -21311 0
 21308  21309 -21310 -169  21312 0
 21308  21309 -21310 -169 -21313 0

c  2+1 --> break 
c    (-b^{169, 1}_2 ∧  b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧  p_169) -> break
c  in CNF:
c     b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ -p_169 ∨ break
c  in DIMACS:
 21308 -21309  21310 -169 1162 0


c  2-1 --> 1
c    (-b^{169, 1}_2 ∧  b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧ -p_169) -> (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0)
c  in CNF:
c     b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_2
c     b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_1
c     b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨  b^{169, 2}_0
c  in DIMACS:
 21308 -21309  21310  169 -21311 0
 21308 -21309  21310  169 -21312 0
 21308 -21309  21310  169  21313 0

c  1-1 --> 0
c    (-b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧  b^{169, 1}_0 ∧ -p_169) -> (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧ -b^{169, 2}_0)
c  in CNF:
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_2
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_1
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_0
c  in DIMACS:
 21308  21309 -21310  169 -21311 0
 21308  21309 -21310  169 -21312 0
 21308  21309 -21310  169 -21313 0

c  0-1 --> -1
c    (-b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧ -p_169) -> ( b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0)
c  in CNF:
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨  b^{169, 2}_2
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_1
c     b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨  b^{169, 2}_0
c  in DIMACS:
 21308  21309  21310  169  21311 0
 21308  21309  21310  169 -21312 0
 21308  21309  21310  169  21313 0

c  -1-1 --> -2
c    ( b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧  b^{169, 1}_0 ∧ -p_169) -> ( b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0)
c  in CNF:
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨  b^{169, 2}_2
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨  b^{169, 2}_1
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨  p_169 ∨ -b^{169, 2}_0
c  in DIMACS:
-21308  21309 -21310  169  21311 0
-21308  21309 -21310  169  21312 0
-21308  21309 -21310  169 -21313 0

c  -2-1 --> break 
c    ( b^{169, 1}_2 ∧  b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧ -p_169) -> break
c  in CNF:
c    -b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨  b^{169, 1}_0 ∨  p_169 ∨ break
c  in DIMACS:
-21308 -21309  21310  169 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 1}_2 ∧ -b^{169, 1}_1 ∧ -b^{169, 1}_0 ∧ true) 
c  in CNF:
c    -b^{169, 1}_2 ∨  b^{169, 1}_1 ∨  b^{169, 1}_0 ∨ false 
c  in DIMACS:
-21308  21309  21310  0

c  3 does not represent an automaton state.
c    -(-b^{169, 1}_2 ∧  b^{169, 1}_1 ∧  b^{169, 1}_0 ∧ true) 
c  in CNF:
c     b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ false 
c  in DIMACS:
 21308 -21309 -21310  0
c  -3 does not represent an automaton state.
c    -( b^{169, 1}_2 ∧  b^{169, 1}_1 ∧  b^{169, 1}_0 ∧ true) 
c  in CNF:
c    -b^{169, 1}_2 ∨ -b^{169, 1}_1 ∨ -b^{169, 1}_0 ∨ false 
c  in DIMACS:
-21308 -21309 -21310  0

c i = 2
c  -2+1 --> -1
c    ( b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧  p_338) -> ( b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0)
c  in CNF:
c    -b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨  b^{169, 3}_2
c    -b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_1
c    -b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨  b^{169, 3}_0
c  in DIMACS:
-21311 -21312  21313 -338  21314 0
-21311 -21312  21313 -338 -21315 0
-21311 -21312  21313 -338  21316 0

c  -1+1 --> 0
c    ( b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0 ∧  p_338) -> (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧ -b^{169, 3}_0)
c  in CNF:
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_2
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_1
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_0
c  in DIMACS:
-21311  21312 -21313 -338 -21314 0
-21311  21312 -21313 -338 -21315 0
-21311  21312 -21313 -338 -21316 0

c  0+1 --> 1
c    (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧  p_338) -> (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0)
c  in CNF:
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_2
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_1
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨  b^{169, 3}_0
c  in DIMACS:
 21311  21312  21313 -338 -21314 0
 21311  21312  21313 -338 -21315 0
 21311  21312  21313 -338  21316 0

c  1+1 --> 2
c    (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0 ∧  p_338) -> (-b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0)
c  in CNF:
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_2
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨  b^{169, 3}_1
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ -p_338 ∨ -b^{169, 3}_0
c  in DIMACS:
 21311  21312 -21313 -338 -21314 0
 21311  21312 -21313 -338  21315 0
 21311  21312 -21313 -338 -21316 0

c  2+1 --> break 
c    (-b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧  p_338) -> break
c  in CNF:
c     b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 21311 -21312  21313 -338 1162 0


c  2-1 --> 1
c    (-b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧ -p_338) -> (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0)
c  in CNF:
c     b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_2
c     b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_1
c     b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨  b^{169, 3}_0
c  in DIMACS:
 21311 -21312  21313  338 -21314 0
 21311 -21312  21313  338 -21315 0
 21311 -21312  21313  338  21316 0

c  1-1 --> 0
c    (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0 ∧ -p_338) -> (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧ -b^{169, 3}_0)
c  in CNF:
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_2
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_1
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_0
c  in DIMACS:
 21311  21312 -21313  338 -21314 0
 21311  21312 -21313  338 -21315 0
 21311  21312 -21313  338 -21316 0

c  0-1 --> -1
c    (-b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧ -p_338) -> ( b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0)
c  in CNF:
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨  b^{169, 3}_2
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_1
c     b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨  b^{169, 3}_0
c  in DIMACS:
 21311  21312  21313  338  21314 0
 21311  21312  21313  338 -21315 0
 21311  21312  21313  338  21316 0

c  -1-1 --> -2
c    ( b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧  b^{169, 2}_0 ∧ -p_338) -> ( b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0)
c  in CNF:
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨  b^{169, 3}_2
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨  b^{169, 3}_1
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨  p_338 ∨ -b^{169, 3}_0
c  in DIMACS:
-21311  21312 -21313  338  21314 0
-21311  21312 -21313  338  21315 0
-21311  21312 -21313  338 -21316 0

c  -2-1 --> break 
c    ( b^{169, 2}_2 ∧  b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨  b^{169, 2}_0 ∨  p_338 ∨ break
c  in DIMACS:
-21311 -21312  21313  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 2}_2 ∧ -b^{169, 2}_1 ∧ -b^{169, 2}_0 ∧ true) 
c  in CNF:
c    -b^{169, 2}_2 ∨  b^{169, 2}_1 ∨  b^{169, 2}_0 ∨ false 
c  in DIMACS:
-21311  21312  21313  0

c  3 does not represent an automaton state.
c    -(-b^{169, 2}_2 ∧  b^{169, 2}_1 ∧  b^{169, 2}_0 ∧ true) 
c  in CNF:
c     b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ false 
c  in DIMACS:
 21311 -21312 -21313  0
c  -3 does not represent an automaton state.
c    -( b^{169, 2}_2 ∧  b^{169, 2}_1 ∧  b^{169, 2}_0 ∧ true) 
c  in CNF:
c    -b^{169, 2}_2 ∨ -b^{169, 2}_1 ∨ -b^{169, 2}_0 ∨ false 
c  in DIMACS:
-21311 -21312 -21313  0

c i = 3
c  -2+1 --> -1
c    ( b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧  p_507) -> ( b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0)
c  in CNF:
c    -b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨  b^{169, 4}_2
c    -b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_1
c    -b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨  b^{169, 4}_0
c  in DIMACS:
-21314 -21315  21316 -507  21317 0
-21314 -21315  21316 -507 -21318 0
-21314 -21315  21316 -507  21319 0

c  -1+1 --> 0
c    ( b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0 ∧  p_507) -> (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧ -b^{169, 4}_0)
c  in CNF:
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_2
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_1
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_0
c  in DIMACS:
-21314  21315 -21316 -507 -21317 0
-21314  21315 -21316 -507 -21318 0
-21314  21315 -21316 -507 -21319 0

c  0+1 --> 1
c    (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧  p_507) -> (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0)
c  in CNF:
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_2
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_1
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨  b^{169, 4}_0
c  in DIMACS:
 21314  21315  21316 -507 -21317 0
 21314  21315  21316 -507 -21318 0
 21314  21315  21316 -507  21319 0

c  1+1 --> 2
c    (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0 ∧  p_507) -> (-b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0)
c  in CNF:
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_2
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨  b^{169, 4}_1
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ -p_507 ∨ -b^{169, 4}_0
c  in DIMACS:
 21314  21315 -21316 -507 -21317 0
 21314  21315 -21316 -507  21318 0
 21314  21315 -21316 -507 -21319 0

c  2+1 --> break 
c    (-b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧  p_507) -> break
c  in CNF:
c     b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ -p_507 ∨ break
c  in DIMACS:
 21314 -21315  21316 -507 1162 0


c  2-1 --> 1
c    (-b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧ -p_507) -> (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0)
c  in CNF:
c     b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_2
c     b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_1
c     b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨  b^{169, 4}_0
c  in DIMACS:
 21314 -21315  21316  507 -21317 0
 21314 -21315  21316  507 -21318 0
 21314 -21315  21316  507  21319 0

c  1-1 --> 0
c    (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0 ∧ -p_507) -> (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧ -b^{169, 4}_0)
c  in CNF:
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_2
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_1
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_0
c  in DIMACS:
 21314  21315 -21316  507 -21317 0
 21314  21315 -21316  507 -21318 0
 21314  21315 -21316  507 -21319 0

c  0-1 --> -1
c    (-b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧ -p_507) -> ( b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0)
c  in CNF:
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨  b^{169, 4}_2
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_1
c     b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨  b^{169, 4}_0
c  in DIMACS:
 21314  21315  21316  507  21317 0
 21314  21315  21316  507 -21318 0
 21314  21315  21316  507  21319 0

c  -1-1 --> -2
c    ( b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧  b^{169, 3}_0 ∧ -p_507) -> ( b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0)
c  in CNF:
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨  b^{169, 4}_2
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨  b^{169, 4}_1
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨  p_507 ∨ -b^{169, 4}_0
c  in DIMACS:
-21314  21315 -21316  507  21317 0
-21314  21315 -21316  507  21318 0
-21314  21315 -21316  507 -21319 0

c  -2-1 --> break 
c    ( b^{169, 3}_2 ∧  b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧ -p_507) -> break
c  in CNF:
c    -b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨  b^{169, 3}_0 ∨  p_507 ∨ break
c  in DIMACS:
-21314 -21315  21316  507 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 3}_2 ∧ -b^{169, 3}_1 ∧ -b^{169, 3}_0 ∧ true) 
c  in CNF:
c    -b^{169, 3}_2 ∨  b^{169, 3}_1 ∨  b^{169, 3}_0 ∨ false 
c  in DIMACS:
-21314  21315  21316  0

c  3 does not represent an automaton state.
c    -(-b^{169, 3}_2 ∧  b^{169, 3}_1 ∧  b^{169, 3}_0 ∧ true) 
c  in CNF:
c     b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ false 
c  in DIMACS:
 21314 -21315 -21316  0
c  -3 does not represent an automaton state.
c    -( b^{169, 3}_2 ∧  b^{169, 3}_1 ∧  b^{169, 3}_0 ∧ true) 
c  in CNF:
c    -b^{169, 3}_2 ∨ -b^{169, 3}_1 ∨ -b^{169, 3}_0 ∨ false 
c  in DIMACS:
-21314 -21315 -21316  0

c i = 4
c  -2+1 --> -1
c    ( b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧  p_676) -> ( b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0)
c  in CNF:
c    -b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨  b^{169, 5}_2
c    -b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_1
c    -b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨  b^{169, 5}_0
c  in DIMACS:
-21317 -21318  21319 -676  21320 0
-21317 -21318  21319 -676 -21321 0
-21317 -21318  21319 -676  21322 0

c  -1+1 --> 0
c    ( b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0 ∧  p_676) -> (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧ -b^{169, 5}_0)
c  in CNF:
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_2
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_1
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_0
c  in DIMACS:
-21317  21318 -21319 -676 -21320 0
-21317  21318 -21319 -676 -21321 0
-21317  21318 -21319 -676 -21322 0

c  0+1 --> 1
c    (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧  p_676) -> (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0)
c  in CNF:
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_2
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_1
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨  b^{169, 5}_0
c  in DIMACS:
 21317  21318  21319 -676 -21320 0
 21317  21318  21319 -676 -21321 0
 21317  21318  21319 -676  21322 0

c  1+1 --> 2
c    (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0 ∧  p_676) -> (-b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0)
c  in CNF:
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_2
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨  b^{169, 5}_1
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ -p_676 ∨ -b^{169, 5}_0
c  in DIMACS:
 21317  21318 -21319 -676 -21320 0
 21317  21318 -21319 -676  21321 0
 21317  21318 -21319 -676 -21322 0

c  2+1 --> break 
c    (-b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧  p_676) -> break
c  in CNF:
c     b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 21317 -21318  21319 -676 1162 0


c  2-1 --> 1
c    (-b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧ -p_676) -> (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0)
c  in CNF:
c     b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_2
c     b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_1
c     b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨  b^{169, 5}_0
c  in DIMACS:
 21317 -21318  21319  676 -21320 0
 21317 -21318  21319  676 -21321 0
 21317 -21318  21319  676  21322 0

c  1-1 --> 0
c    (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0 ∧ -p_676) -> (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧ -b^{169, 5}_0)
c  in CNF:
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_2
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_1
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_0
c  in DIMACS:
 21317  21318 -21319  676 -21320 0
 21317  21318 -21319  676 -21321 0
 21317  21318 -21319  676 -21322 0

c  0-1 --> -1
c    (-b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧ -p_676) -> ( b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0)
c  in CNF:
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨  b^{169, 5}_2
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_1
c     b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨  b^{169, 5}_0
c  in DIMACS:
 21317  21318  21319  676  21320 0
 21317  21318  21319  676 -21321 0
 21317  21318  21319  676  21322 0

c  -1-1 --> -2
c    ( b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧  b^{169, 4}_0 ∧ -p_676) -> ( b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0)
c  in CNF:
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨  b^{169, 5}_2
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨  b^{169, 5}_1
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨  p_676 ∨ -b^{169, 5}_0
c  in DIMACS:
-21317  21318 -21319  676  21320 0
-21317  21318 -21319  676  21321 0
-21317  21318 -21319  676 -21322 0

c  -2-1 --> break 
c    ( b^{169, 4}_2 ∧  b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨  b^{169, 4}_0 ∨  p_676 ∨ break
c  in DIMACS:
-21317 -21318  21319  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 4}_2 ∧ -b^{169, 4}_1 ∧ -b^{169, 4}_0 ∧ true) 
c  in CNF:
c    -b^{169, 4}_2 ∨  b^{169, 4}_1 ∨  b^{169, 4}_0 ∨ false 
c  in DIMACS:
-21317  21318  21319  0

c  3 does not represent an automaton state.
c    -(-b^{169, 4}_2 ∧  b^{169, 4}_1 ∧  b^{169, 4}_0 ∧ true) 
c  in CNF:
c     b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ false 
c  in DIMACS:
 21317 -21318 -21319  0
c  -3 does not represent an automaton state.
c    -( b^{169, 4}_2 ∧  b^{169, 4}_1 ∧  b^{169, 4}_0 ∧ true) 
c  in CNF:
c    -b^{169, 4}_2 ∨ -b^{169, 4}_1 ∨ -b^{169, 4}_0 ∨ false 
c  in DIMACS:
-21317 -21318 -21319  0

c i = 5
c  -2+1 --> -1
c    ( b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧  p_845) -> ( b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0)
c  in CNF:
c    -b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨  b^{169, 6}_2
c    -b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_1
c    -b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨  b^{169, 6}_0
c  in DIMACS:
-21320 -21321  21322 -845  21323 0
-21320 -21321  21322 -845 -21324 0
-21320 -21321  21322 -845  21325 0

c  -1+1 --> 0
c    ( b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0 ∧  p_845) -> (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧ -b^{169, 6}_0)
c  in CNF:
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_2
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_1
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_0
c  in DIMACS:
-21320  21321 -21322 -845 -21323 0
-21320  21321 -21322 -845 -21324 0
-21320  21321 -21322 -845 -21325 0

c  0+1 --> 1
c    (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧  p_845) -> (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0)
c  in CNF:
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_2
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_1
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨  b^{169, 6}_0
c  in DIMACS:
 21320  21321  21322 -845 -21323 0
 21320  21321  21322 -845 -21324 0
 21320  21321  21322 -845  21325 0

c  1+1 --> 2
c    (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0 ∧  p_845) -> (-b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0)
c  in CNF:
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_2
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨  b^{169, 6}_1
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ -p_845 ∨ -b^{169, 6}_0
c  in DIMACS:
 21320  21321 -21322 -845 -21323 0
 21320  21321 -21322 -845  21324 0
 21320  21321 -21322 -845 -21325 0

c  2+1 --> break 
c    (-b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧  p_845) -> break
c  in CNF:
c     b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ -p_845 ∨ break
c  in DIMACS:
 21320 -21321  21322 -845 1162 0


c  2-1 --> 1
c    (-b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧ -p_845) -> (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0)
c  in CNF:
c     b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_2
c     b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_1
c     b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨  b^{169, 6}_0
c  in DIMACS:
 21320 -21321  21322  845 -21323 0
 21320 -21321  21322  845 -21324 0
 21320 -21321  21322  845  21325 0

c  1-1 --> 0
c    (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0 ∧ -p_845) -> (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧ -b^{169, 6}_0)
c  in CNF:
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_2
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_1
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_0
c  in DIMACS:
 21320  21321 -21322  845 -21323 0
 21320  21321 -21322  845 -21324 0
 21320  21321 -21322  845 -21325 0

c  0-1 --> -1
c    (-b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧ -p_845) -> ( b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0)
c  in CNF:
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨  b^{169, 6}_2
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_1
c     b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨  b^{169, 6}_0
c  in DIMACS:
 21320  21321  21322  845  21323 0
 21320  21321  21322  845 -21324 0
 21320  21321  21322  845  21325 0

c  -1-1 --> -2
c    ( b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧  b^{169, 5}_0 ∧ -p_845) -> ( b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0)
c  in CNF:
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨  b^{169, 6}_2
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨  b^{169, 6}_1
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨  p_845 ∨ -b^{169, 6}_0
c  in DIMACS:
-21320  21321 -21322  845  21323 0
-21320  21321 -21322  845  21324 0
-21320  21321 -21322  845 -21325 0

c  -2-1 --> break 
c    ( b^{169, 5}_2 ∧  b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧ -p_845) -> break
c  in CNF:
c    -b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨  b^{169, 5}_0 ∨  p_845 ∨ break
c  in DIMACS:
-21320 -21321  21322  845 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 5}_2 ∧ -b^{169, 5}_1 ∧ -b^{169, 5}_0 ∧ true) 
c  in CNF:
c    -b^{169, 5}_2 ∨  b^{169, 5}_1 ∨  b^{169, 5}_0 ∨ false 
c  in DIMACS:
-21320  21321  21322  0

c  3 does not represent an automaton state.
c    -(-b^{169, 5}_2 ∧  b^{169, 5}_1 ∧  b^{169, 5}_0 ∧ true) 
c  in CNF:
c     b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ false 
c  in DIMACS:
 21320 -21321 -21322  0
c  -3 does not represent an automaton state.
c    -( b^{169, 5}_2 ∧  b^{169, 5}_1 ∧  b^{169, 5}_0 ∧ true) 
c  in CNF:
c    -b^{169, 5}_2 ∨ -b^{169, 5}_1 ∨ -b^{169, 5}_0 ∨ false 
c  in DIMACS:
-21320 -21321 -21322  0

c i = 6
c  -2+1 --> -1
c    ( b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧  p_1014) -> ( b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧  b^{169, 7}_0)
c  in CNF:
c    -b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨  b^{169, 7}_2
c    -b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_1
c    -b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨  b^{169, 7}_0
c  in DIMACS:
-21323 -21324  21325 -1014  21326 0
-21323 -21324  21325 -1014 -21327 0
-21323 -21324  21325 -1014  21328 0

c  -1+1 --> 0
c    ( b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0 ∧  p_1014) -> (-b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧ -b^{169, 7}_0)
c  in CNF:
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_2
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_1
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_0
c  in DIMACS:
-21323  21324 -21325 -1014 -21326 0
-21323  21324 -21325 -1014 -21327 0
-21323  21324 -21325 -1014 -21328 0

c  0+1 --> 1
c    (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧  p_1014) -> (-b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧  b^{169, 7}_0)
c  in CNF:
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_2
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_1
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨  b^{169, 7}_0
c  in DIMACS:
 21323  21324  21325 -1014 -21326 0
 21323  21324  21325 -1014 -21327 0
 21323  21324  21325 -1014  21328 0

c  1+1 --> 2
c    (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0 ∧  p_1014) -> (-b^{169, 7}_2 ∧  b^{169, 7}_1 ∧ -b^{169, 7}_0)
c  in CNF:
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_2
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨  b^{169, 7}_1
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ -p_1014 ∨ -b^{169, 7}_0
c  in DIMACS:
 21323  21324 -21325 -1014 -21326 0
 21323  21324 -21325 -1014  21327 0
 21323  21324 -21325 -1014 -21328 0

c  2+1 --> break 
c    (-b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 21323 -21324  21325 -1014 1162 0


c  2-1 --> 1
c    (-b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧ -p_1014) -> (-b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧  b^{169, 7}_0)
c  in CNF:
c     b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_2
c     b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_1
c     b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨  b^{169, 7}_0
c  in DIMACS:
 21323 -21324  21325  1014 -21326 0
 21323 -21324  21325  1014 -21327 0
 21323 -21324  21325  1014  21328 0

c  1-1 --> 0
c    (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0 ∧ -p_1014) -> (-b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧ -b^{169, 7}_0)
c  in CNF:
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_2
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_1
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_0
c  in DIMACS:
 21323  21324 -21325  1014 -21326 0
 21323  21324 -21325  1014 -21327 0
 21323  21324 -21325  1014 -21328 0

c  0-1 --> -1
c    (-b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧ -p_1014) -> ( b^{169, 7}_2 ∧ -b^{169, 7}_1 ∧  b^{169, 7}_0)
c  in CNF:
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨  b^{169, 7}_2
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_1
c     b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨  b^{169, 7}_0
c  in DIMACS:
 21323  21324  21325  1014  21326 0
 21323  21324  21325  1014 -21327 0
 21323  21324  21325  1014  21328 0

c  -1-1 --> -2
c    ( b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧  b^{169, 6}_0 ∧ -p_1014) -> ( b^{169, 7}_2 ∧  b^{169, 7}_1 ∧ -b^{169, 7}_0)
c  in CNF:
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨  b^{169, 7}_2
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨  b^{169, 7}_1
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨  p_1014 ∨ -b^{169, 7}_0
c  in DIMACS:
-21323  21324 -21325  1014  21326 0
-21323  21324 -21325  1014  21327 0
-21323  21324 -21325  1014 -21328 0

c  -2-1 --> break 
c    ( b^{169, 6}_2 ∧  b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨  b^{169, 6}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-21323 -21324  21325  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{169, 6}_2 ∧ -b^{169, 6}_1 ∧ -b^{169, 6}_0 ∧ true) 
c  in CNF:
c    -b^{169, 6}_2 ∨  b^{169, 6}_1 ∨  b^{169, 6}_0 ∨ false 
c  in DIMACS:
-21323  21324  21325  0

c  3 does not represent an automaton state.
c    -(-b^{169, 6}_2 ∧  b^{169, 6}_1 ∧  b^{169, 6}_0 ∧ true) 
c  in CNF:
c     b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ false 
c  in DIMACS:
 21323 -21324 -21325  0
c  -3 does not represent an automaton state.
c    -( b^{169, 6}_2 ∧  b^{169, 6}_1 ∧  b^{169, 6}_0 ∧ true) 
c  in CNF:
c    -b^{169, 6}_2 ∨ -b^{169, 6}_1 ∨ -b^{169, 6}_0 ∨ false 
c  in DIMACS:
-21323 -21324 -21325  0

c INIT for k = 170
c    -b^{170, 1}_2
c    -b^{170, 1}_1
c    -b^{170, 1}_0
c  in DIMACS:
-21329 0
-21330 0
-21331 0

c Transitions for k = 170
c i = 1
c  -2+1 --> -1
c    ( b^{170, 1}_2 ∧  b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧  p_170) -> ( b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0)
c  in CNF:
c    -b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨  b^{170, 2}_2
c    -b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_1
c    -b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨  b^{170, 2}_0
c  in DIMACS:
-21329 -21330  21331 -170  21332 0
-21329 -21330  21331 -170 -21333 0
-21329 -21330  21331 -170  21334 0

c  -1+1 --> 0
c    ( b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧  b^{170, 1}_0 ∧  p_170) -> (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧ -b^{170, 2}_0)
c  in CNF:
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_2
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_1
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_0
c  in DIMACS:
-21329  21330 -21331 -170 -21332 0
-21329  21330 -21331 -170 -21333 0
-21329  21330 -21331 -170 -21334 0

c  0+1 --> 1
c    (-b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧  p_170) -> (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0)
c  in CNF:
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_2
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_1
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨  b^{170, 2}_0
c  in DIMACS:
 21329  21330  21331 -170 -21332 0
 21329  21330  21331 -170 -21333 0
 21329  21330  21331 -170  21334 0

c  1+1 --> 2
c    (-b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧  b^{170, 1}_0 ∧  p_170) -> (-b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0)
c  in CNF:
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_2
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨  b^{170, 2}_1
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ -p_170 ∨ -b^{170, 2}_0
c  in DIMACS:
 21329  21330 -21331 -170 -21332 0
 21329  21330 -21331 -170  21333 0
 21329  21330 -21331 -170 -21334 0

c  2+1 --> break 
c    (-b^{170, 1}_2 ∧  b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧  p_170) -> break
c  in CNF:
c     b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ -p_170 ∨ break
c  in DIMACS:
 21329 -21330  21331 -170 1162 0


c  2-1 --> 1
c    (-b^{170, 1}_2 ∧  b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧ -p_170) -> (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0)
c  in CNF:
c     b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_2
c     b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_1
c     b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨  b^{170, 2}_0
c  in DIMACS:
 21329 -21330  21331  170 -21332 0
 21329 -21330  21331  170 -21333 0
 21329 -21330  21331  170  21334 0

c  1-1 --> 0
c    (-b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧  b^{170, 1}_0 ∧ -p_170) -> (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧ -b^{170, 2}_0)
c  in CNF:
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_2
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_1
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_0
c  in DIMACS:
 21329  21330 -21331  170 -21332 0
 21329  21330 -21331  170 -21333 0
 21329  21330 -21331  170 -21334 0

c  0-1 --> -1
c    (-b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧ -p_170) -> ( b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0)
c  in CNF:
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨  b^{170, 2}_2
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_1
c     b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨  b^{170, 2}_0
c  in DIMACS:
 21329  21330  21331  170  21332 0
 21329  21330  21331  170 -21333 0
 21329  21330  21331  170  21334 0

c  -1-1 --> -2
c    ( b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧  b^{170, 1}_0 ∧ -p_170) -> ( b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0)
c  in CNF:
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨  b^{170, 2}_2
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨  b^{170, 2}_1
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨  p_170 ∨ -b^{170, 2}_0
c  in DIMACS:
-21329  21330 -21331  170  21332 0
-21329  21330 -21331  170  21333 0
-21329  21330 -21331  170 -21334 0

c  -2-1 --> break 
c    ( b^{170, 1}_2 ∧  b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧ -p_170) -> break
c  in CNF:
c    -b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨  b^{170, 1}_0 ∨  p_170 ∨ break
c  in DIMACS:
-21329 -21330  21331  170 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 1}_2 ∧ -b^{170, 1}_1 ∧ -b^{170, 1}_0 ∧ true) 
c  in CNF:
c    -b^{170, 1}_2 ∨  b^{170, 1}_1 ∨  b^{170, 1}_0 ∨ false 
c  in DIMACS:
-21329  21330  21331  0

c  3 does not represent an automaton state.
c    -(-b^{170, 1}_2 ∧  b^{170, 1}_1 ∧  b^{170, 1}_0 ∧ true) 
c  in CNF:
c     b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ false 
c  in DIMACS:
 21329 -21330 -21331  0
c  -3 does not represent an automaton state.
c    -( b^{170, 1}_2 ∧  b^{170, 1}_1 ∧  b^{170, 1}_0 ∧ true) 
c  in CNF:
c    -b^{170, 1}_2 ∨ -b^{170, 1}_1 ∨ -b^{170, 1}_0 ∨ false 
c  in DIMACS:
-21329 -21330 -21331  0

c i = 2
c  -2+1 --> -1
c    ( b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧  p_340) -> ( b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0)
c  in CNF:
c    -b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨  b^{170, 3}_2
c    -b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_1
c    -b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨  b^{170, 3}_0
c  in DIMACS:
-21332 -21333  21334 -340  21335 0
-21332 -21333  21334 -340 -21336 0
-21332 -21333  21334 -340  21337 0

c  -1+1 --> 0
c    ( b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0 ∧  p_340) -> (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧ -b^{170, 3}_0)
c  in CNF:
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_2
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_1
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_0
c  in DIMACS:
-21332  21333 -21334 -340 -21335 0
-21332  21333 -21334 -340 -21336 0
-21332  21333 -21334 -340 -21337 0

c  0+1 --> 1
c    (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧  p_340) -> (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0)
c  in CNF:
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_2
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_1
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨  b^{170, 3}_0
c  in DIMACS:
 21332  21333  21334 -340 -21335 0
 21332  21333  21334 -340 -21336 0
 21332  21333  21334 -340  21337 0

c  1+1 --> 2
c    (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0 ∧  p_340) -> (-b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0)
c  in CNF:
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_2
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨  b^{170, 3}_1
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ -p_340 ∨ -b^{170, 3}_0
c  in DIMACS:
 21332  21333 -21334 -340 -21335 0
 21332  21333 -21334 -340  21336 0
 21332  21333 -21334 -340 -21337 0

c  2+1 --> break 
c    (-b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧  p_340) -> break
c  in CNF:
c     b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 21332 -21333  21334 -340 1162 0


c  2-1 --> 1
c    (-b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧ -p_340) -> (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0)
c  in CNF:
c     b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_2
c     b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_1
c     b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨  b^{170, 3}_0
c  in DIMACS:
 21332 -21333  21334  340 -21335 0
 21332 -21333  21334  340 -21336 0
 21332 -21333  21334  340  21337 0

c  1-1 --> 0
c    (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0 ∧ -p_340) -> (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧ -b^{170, 3}_0)
c  in CNF:
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_2
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_1
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_0
c  in DIMACS:
 21332  21333 -21334  340 -21335 0
 21332  21333 -21334  340 -21336 0
 21332  21333 -21334  340 -21337 0

c  0-1 --> -1
c    (-b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧ -p_340) -> ( b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0)
c  in CNF:
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨  b^{170, 3}_2
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_1
c     b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨  b^{170, 3}_0
c  in DIMACS:
 21332  21333  21334  340  21335 0
 21332  21333  21334  340 -21336 0
 21332  21333  21334  340  21337 0

c  -1-1 --> -2
c    ( b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧  b^{170, 2}_0 ∧ -p_340) -> ( b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0)
c  in CNF:
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨  b^{170, 3}_2
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨  b^{170, 3}_1
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨  p_340 ∨ -b^{170, 3}_0
c  in DIMACS:
-21332  21333 -21334  340  21335 0
-21332  21333 -21334  340  21336 0
-21332  21333 -21334  340 -21337 0

c  -2-1 --> break 
c    ( b^{170, 2}_2 ∧  b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨  b^{170, 2}_0 ∨  p_340 ∨ break
c  in DIMACS:
-21332 -21333  21334  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 2}_2 ∧ -b^{170, 2}_1 ∧ -b^{170, 2}_0 ∧ true) 
c  in CNF:
c    -b^{170, 2}_2 ∨  b^{170, 2}_1 ∨  b^{170, 2}_0 ∨ false 
c  in DIMACS:
-21332  21333  21334  0

c  3 does not represent an automaton state.
c    -(-b^{170, 2}_2 ∧  b^{170, 2}_1 ∧  b^{170, 2}_0 ∧ true) 
c  in CNF:
c     b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ false 
c  in DIMACS:
 21332 -21333 -21334  0
c  -3 does not represent an automaton state.
c    -( b^{170, 2}_2 ∧  b^{170, 2}_1 ∧  b^{170, 2}_0 ∧ true) 
c  in CNF:
c    -b^{170, 2}_2 ∨ -b^{170, 2}_1 ∨ -b^{170, 2}_0 ∨ false 
c  in DIMACS:
-21332 -21333 -21334  0

c i = 3
c  -2+1 --> -1
c    ( b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧  p_510) -> ( b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0)
c  in CNF:
c    -b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨  b^{170, 4}_2
c    -b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_1
c    -b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨  b^{170, 4}_0
c  in DIMACS:
-21335 -21336  21337 -510  21338 0
-21335 -21336  21337 -510 -21339 0
-21335 -21336  21337 -510  21340 0

c  -1+1 --> 0
c    ( b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0 ∧  p_510) -> (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧ -b^{170, 4}_0)
c  in CNF:
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_2
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_1
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_0
c  in DIMACS:
-21335  21336 -21337 -510 -21338 0
-21335  21336 -21337 -510 -21339 0
-21335  21336 -21337 -510 -21340 0

c  0+1 --> 1
c    (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧  p_510) -> (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0)
c  in CNF:
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_2
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_1
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨  b^{170, 4}_0
c  in DIMACS:
 21335  21336  21337 -510 -21338 0
 21335  21336  21337 -510 -21339 0
 21335  21336  21337 -510  21340 0

c  1+1 --> 2
c    (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0 ∧  p_510) -> (-b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0)
c  in CNF:
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_2
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨  b^{170, 4}_1
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ -p_510 ∨ -b^{170, 4}_0
c  in DIMACS:
 21335  21336 -21337 -510 -21338 0
 21335  21336 -21337 -510  21339 0
 21335  21336 -21337 -510 -21340 0

c  2+1 --> break 
c    (-b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧  p_510) -> break
c  in CNF:
c     b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 21335 -21336  21337 -510 1162 0


c  2-1 --> 1
c    (-b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧ -p_510) -> (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0)
c  in CNF:
c     b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_2
c     b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_1
c     b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨  b^{170, 4}_0
c  in DIMACS:
 21335 -21336  21337  510 -21338 0
 21335 -21336  21337  510 -21339 0
 21335 -21336  21337  510  21340 0

c  1-1 --> 0
c    (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0 ∧ -p_510) -> (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧ -b^{170, 4}_0)
c  in CNF:
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_2
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_1
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_0
c  in DIMACS:
 21335  21336 -21337  510 -21338 0
 21335  21336 -21337  510 -21339 0
 21335  21336 -21337  510 -21340 0

c  0-1 --> -1
c    (-b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧ -p_510) -> ( b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0)
c  in CNF:
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨  b^{170, 4}_2
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_1
c     b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨  b^{170, 4}_0
c  in DIMACS:
 21335  21336  21337  510  21338 0
 21335  21336  21337  510 -21339 0
 21335  21336  21337  510  21340 0

c  -1-1 --> -2
c    ( b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧  b^{170, 3}_0 ∧ -p_510) -> ( b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0)
c  in CNF:
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨  b^{170, 4}_2
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨  b^{170, 4}_1
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨  p_510 ∨ -b^{170, 4}_0
c  in DIMACS:
-21335  21336 -21337  510  21338 0
-21335  21336 -21337  510  21339 0
-21335  21336 -21337  510 -21340 0

c  -2-1 --> break 
c    ( b^{170, 3}_2 ∧  b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨  b^{170, 3}_0 ∨  p_510 ∨ break
c  in DIMACS:
-21335 -21336  21337  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 3}_2 ∧ -b^{170, 3}_1 ∧ -b^{170, 3}_0 ∧ true) 
c  in CNF:
c    -b^{170, 3}_2 ∨  b^{170, 3}_1 ∨  b^{170, 3}_0 ∨ false 
c  in DIMACS:
-21335  21336  21337  0

c  3 does not represent an automaton state.
c    -(-b^{170, 3}_2 ∧  b^{170, 3}_1 ∧  b^{170, 3}_0 ∧ true) 
c  in CNF:
c     b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ false 
c  in DIMACS:
 21335 -21336 -21337  0
c  -3 does not represent an automaton state.
c    -( b^{170, 3}_2 ∧  b^{170, 3}_1 ∧  b^{170, 3}_0 ∧ true) 
c  in CNF:
c    -b^{170, 3}_2 ∨ -b^{170, 3}_1 ∨ -b^{170, 3}_0 ∨ false 
c  in DIMACS:
-21335 -21336 -21337  0

c i = 4
c  -2+1 --> -1
c    ( b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧  p_680) -> ( b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0)
c  in CNF:
c    -b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨  b^{170, 5}_2
c    -b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_1
c    -b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨  b^{170, 5}_0
c  in DIMACS:
-21338 -21339  21340 -680  21341 0
-21338 -21339  21340 -680 -21342 0
-21338 -21339  21340 -680  21343 0

c  -1+1 --> 0
c    ( b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0 ∧  p_680) -> (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧ -b^{170, 5}_0)
c  in CNF:
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_2
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_1
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_0
c  in DIMACS:
-21338  21339 -21340 -680 -21341 0
-21338  21339 -21340 -680 -21342 0
-21338  21339 -21340 -680 -21343 0

c  0+1 --> 1
c    (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧  p_680) -> (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0)
c  in CNF:
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_2
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_1
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨  b^{170, 5}_0
c  in DIMACS:
 21338  21339  21340 -680 -21341 0
 21338  21339  21340 -680 -21342 0
 21338  21339  21340 -680  21343 0

c  1+1 --> 2
c    (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0 ∧  p_680) -> (-b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0)
c  in CNF:
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_2
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨  b^{170, 5}_1
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ -p_680 ∨ -b^{170, 5}_0
c  in DIMACS:
 21338  21339 -21340 -680 -21341 0
 21338  21339 -21340 -680  21342 0
 21338  21339 -21340 -680 -21343 0

c  2+1 --> break 
c    (-b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧  p_680) -> break
c  in CNF:
c     b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 21338 -21339  21340 -680 1162 0


c  2-1 --> 1
c    (-b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧ -p_680) -> (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0)
c  in CNF:
c     b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_2
c     b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_1
c     b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨  b^{170, 5}_0
c  in DIMACS:
 21338 -21339  21340  680 -21341 0
 21338 -21339  21340  680 -21342 0
 21338 -21339  21340  680  21343 0

c  1-1 --> 0
c    (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0 ∧ -p_680) -> (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧ -b^{170, 5}_0)
c  in CNF:
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_2
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_1
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_0
c  in DIMACS:
 21338  21339 -21340  680 -21341 0
 21338  21339 -21340  680 -21342 0
 21338  21339 -21340  680 -21343 0

c  0-1 --> -1
c    (-b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧ -p_680) -> ( b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0)
c  in CNF:
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨  b^{170, 5}_2
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_1
c     b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨  b^{170, 5}_0
c  in DIMACS:
 21338  21339  21340  680  21341 0
 21338  21339  21340  680 -21342 0
 21338  21339  21340  680  21343 0

c  -1-1 --> -2
c    ( b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧  b^{170, 4}_0 ∧ -p_680) -> ( b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0)
c  in CNF:
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨  b^{170, 5}_2
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨  b^{170, 5}_1
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨  p_680 ∨ -b^{170, 5}_0
c  in DIMACS:
-21338  21339 -21340  680  21341 0
-21338  21339 -21340  680  21342 0
-21338  21339 -21340  680 -21343 0

c  -2-1 --> break 
c    ( b^{170, 4}_2 ∧  b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨  b^{170, 4}_0 ∨  p_680 ∨ break
c  in DIMACS:
-21338 -21339  21340  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 4}_2 ∧ -b^{170, 4}_1 ∧ -b^{170, 4}_0 ∧ true) 
c  in CNF:
c    -b^{170, 4}_2 ∨  b^{170, 4}_1 ∨  b^{170, 4}_0 ∨ false 
c  in DIMACS:
-21338  21339  21340  0

c  3 does not represent an automaton state.
c    -(-b^{170, 4}_2 ∧  b^{170, 4}_1 ∧  b^{170, 4}_0 ∧ true) 
c  in CNF:
c     b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ false 
c  in DIMACS:
 21338 -21339 -21340  0
c  -3 does not represent an automaton state.
c    -( b^{170, 4}_2 ∧  b^{170, 4}_1 ∧  b^{170, 4}_0 ∧ true) 
c  in CNF:
c    -b^{170, 4}_2 ∨ -b^{170, 4}_1 ∨ -b^{170, 4}_0 ∨ false 
c  in DIMACS:
-21338 -21339 -21340  0

c i = 5
c  -2+1 --> -1
c    ( b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧  p_850) -> ( b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0)
c  in CNF:
c    -b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨  b^{170, 6}_2
c    -b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_1
c    -b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨  b^{170, 6}_0
c  in DIMACS:
-21341 -21342  21343 -850  21344 0
-21341 -21342  21343 -850 -21345 0
-21341 -21342  21343 -850  21346 0

c  -1+1 --> 0
c    ( b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0 ∧  p_850) -> (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧ -b^{170, 6}_0)
c  in CNF:
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_2
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_1
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_0
c  in DIMACS:
-21341  21342 -21343 -850 -21344 0
-21341  21342 -21343 -850 -21345 0
-21341  21342 -21343 -850 -21346 0

c  0+1 --> 1
c    (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧  p_850) -> (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0)
c  in CNF:
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_2
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_1
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨  b^{170, 6}_0
c  in DIMACS:
 21341  21342  21343 -850 -21344 0
 21341  21342  21343 -850 -21345 0
 21341  21342  21343 -850  21346 0

c  1+1 --> 2
c    (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0 ∧  p_850) -> (-b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0)
c  in CNF:
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_2
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨  b^{170, 6}_1
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ -p_850 ∨ -b^{170, 6}_0
c  in DIMACS:
 21341  21342 -21343 -850 -21344 0
 21341  21342 -21343 -850  21345 0
 21341  21342 -21343 -850 -21346 0

c  2+1 --> break 
c    (-b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧  p_850) -> break
c  in CNF:
c     b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ -p_850 ∨ break
c  in DIMACS:
 21341 -21342  21343 -850 1162 0


c  2-1 --> 1
c    (-b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧ -p_850) -> (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0)
c  in CNF:
c     b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_2
c     b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_1
c     b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨  b^{170, 6}_0
c  in DIMACS:
 21341 -21342  21343  850 -21344 0
 21341 -21342  21343  850 -21345 0
 21341 -21342  21343  850  21346 0

c  1-1 --> 0
c    (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0 ∧ -p_850) -> (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧ -b^{170, 6}_0)
c  in CNF:
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_2
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_1
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_0
c  in DIMACS:
 21341  21342 -21343  850 -21344 0
 21341  21342 -21343  850 -21345 0
 21341  21342 -21343  850 -21346 0

c  0-1 --> -1
c    (-b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧ -p_850) -> ( b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0)
c  in CNF:
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨  b^{170, 6}_2
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_1
c     b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨  b^{170, 6}_0
c  in DIMACS:
 21341  21342  21343  850  21344 0
 21341  21342  21343  850 -21345 0
 21341  21342  21343  850  21346 0

c  -1-1 --> -2
c    ( b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧  b^{170, 5}_0 ∧ -p_850) -> ( b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0)
c  in CNF:
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨  b^{170, 6}_2
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨  b^{170, 6}_1
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨  p_850 ∨ -b^{170, 6}_0
c  in DIMACS:
-21341  21342 -21343  850  21344 0
-21341  21342 -21343  850  21345 0
-21341  21342 -21343  850 -21346 0

c  -2-1 --> break 
c    ( b^{170, 5}_2 ∧  b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧ -p_850) -> break
c  in CNF:
c    -b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨  b^{170, 5}_0 ∨  p_850 ∨ break
c  in DIMACS:
-21341 -21342  21343  850 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 5}_2 ∧ -b^{170, 5}_1 ∧ -b^{170, 5}_0 ∧ true) 
c  in CNF:
c    -b^{170, 5}_2 ∨  b^{170, 5}_1 ∨  b^{170, 5}_0 ∨ false 
c  in DIMACS:
-21341  21342  21343  0

c  3 does not represent an automaton state.
c    -(-b^{170, 5}_2 ∧  b^{170, 5}_1 ∧  b^{170, 5}_0 ∧ true) 
c  in CNF:
c     b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ false 
c  in DIMACS:
 21341 -21342 -21343  0
c  -3 does not represent an automaton state.
c    -( b^{170, 5}_2 ∧  b^{170, 5}_1 ∧  b^{170, 5}_0 ∧ true) 
c  in CNF:
c    -b^{170, 5}_2 ∨ -b^{170, 5}_1 ∨ -b^{170, 5}_0 ∨ false 
c  in DIMACS:
-21341 -21342 -21343  0

c i = 6
c  -2+1 --> -1
c    ( b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧  p_1020) -> ( b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧  b^{170, 7}_0)
c  in CNF:
c    -b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨  b^{170, 7}_2
c    -b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_1
c    -b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨  b^{170, 7}_0
c  in DIMACS:
-21344 -21345  21346 -1020  21347 0
-21344 -21345  21346 -1020 -21348 0
-21344 -21345  21346 -1020  21349 0

c  -1+1 --> 0
c    ( b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0 ∧  p_1020) -> (-b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧ -b^{170, 7}_0)
c  in CNF:
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_2
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_1
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_0
c  in DIMACS:
-21344  21345 -21346 -1020 -21347 0
-21344  21345 -21346 -1020 -21348 0
-21344  21345 -21346 -1020 -21349 0

c  0+1 --> 1
c    (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧  p_1020) -> (-b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧  b^{170, 7}_0)
c  in CNF:
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_2
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_1
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨  b^{170, 7}_0
c  in DIMACS:
 21344  21345  21346 -1020 -21347 0
 21344  21345  21346 -1020 -21348 0
 21344  21345  21346 -1020  21349 0

c  1+1 --> 2
c    (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0 ∧  p_1020) -> (-b^{170, 7}_2 ∧  b^{170, 7}_1 ∧ -b^{170, 7}_0)
c  in CNF:
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_2
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨  b^{170, 7}_1
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ -p_1020 ∨ -b^{170, 7}_0
c  in DIMACS:
 21344  21345 -21346 -1020 -21347 0
 21344  21345 -21346 -1020  21348 0
 21344  21345 -21346 -1020 -21349 0

c  2+1 --> break 
c    (-b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 21344 -21345  21346 -1020 1162 0


c  2-1 --> 1
c    (-b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧ -p_1020) -> (-b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧  b^{170, 7}_0)
c  in CNF:
c     b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_2
c     b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_1
c     b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨  b^{170, 7}_0
c  in DIMACS:
 21344 -21345  21346  1020 -21347 0
 21344 -21345  21346  1020 -21348 0
 21344 -21345  21346  1020  21349 0

c  1-1 --> 0
c    (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0 ∧ -p_1020) -> (-b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧ -b^{170, 7}_0)
c  in CNF:
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_2
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_1
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_0
c  in DIMACS:
 21344  21345 -21346  1020 -21347 0
 21344  21345 -21346  1020 -21348 0
 21344  21345 -21346  1020 -21349 0

c  0-1 --> -1
c    (-b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧ -p_1020) -> ( b^{170, 7}_2 ∧ -b^{170, 7}_1 ∧  b^{170, 7}_0)
c  in CNF:
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨  b^{170, 7}_2
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_1
c     b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨  b^{170, 7}_0
c  in DIMACS:
 21344  21345  21346  1020  21347 0
 21344  21345  21346  1020 -21348 0
 21344  21345  21346  1020  21349 0

c  -1-1 --> -2
c    ( b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧  b^{170, 6}_0 ∧ -p_1020) -> ( b^{170, 7}_2 ∧  b^{170, 7}_1 ∧ -b^{170, 7}_0)
c  in CNF:
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨  b^{170, 7}_2
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨  b^{170, 7}_1
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨  p_1020 ∨ -b^{170, 7}_0
c  in DIMACS:
-21344  21345 -21346  1020  21347 0
-21344  21345 -21346  1020  21348 0
-21344  21345 -21346  1020 -21349 0

c  -2-1 --> break 
c    ( b^{170, 6}_2 ∧  b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨  b^{170, 6}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-21344 -21345  21346  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{170, 6}_2 ∧ -b^{170, 6}_1 ∧ -b^{170, 6}_0 ∧ true) 
c  in CNF:
c    -b^{170, 6}_2 ∨  b^{170, 6}_1 ∨  b^{170, 6}_0 ∨ false 
c  in DIMACS:
-21344  21345  21346  0

c  3 does not represent an automaton state.
c    -(-b^{170, 6}_2 ∧  b^{170, 6}_1 ∧  b^{170, 6}_0 ∧ true) 
c  in CNF:
c     b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ false 
c  in DIMACS:
 21344 -21345 -21346  0
c  -3 does not represent an automaton state.
c    -( b^{170, 6}_2 ∧  b^{170, 6}_1 ∧  b^{170, 6}_0 ∧ true) 
c  in CNF:
c    -b^{170, 6}_2 ∨ -b^{170, 6}_1 ∨ -b^{170, 6}_0 ∨ false 
c  in DIMACS:
-21344 -21345 -21346  0

c INIT for k = 171
c    -b^{171, 1}_2
c    -b^{171, 1}_1
c    -b^{171, 1}_0
c  in DIMACS:
-21350 0
-21351 0
-21352 0

c Transitions for k = 171
c i = 1
c  -2+1 --> -1
c    ( b^{171, 1}_2 ∧  b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧  p_171) -> ( b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0)
c  in CNF:
c    -b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨  b^{171, 2}_2
c    -b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_1
c    -b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨  b^{171, 2}_0
c  in DIMACS:
-21350 -21351  21352 -171  21353 0
-21350 -21351  21352 -171 -21354 0
-21350 -21351  21352 -171  21355 0

c  -1+1 --> 0
c    ( b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧  b^{171, 1}_0 ∧  p_171) -> (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧ -b^{171, 2}_0)
c  in CNF:
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_2
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_1
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_0
c  in DIMACS:
-21350  21351 -21352 -171 -21353 0
-21350  21351 -21352 -171 -21354 0
-21350  21351 -21352 -171 -21355 0

c  0+1 --> 1
c    (-b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧  p_171) -> (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0)
c  in CNF:
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_2
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_1
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨  b^{171, 2}_0
c  in DIMACS:
 21350  21351  21352 -171 -21353 0
 21350  21351  21352 -171 -21354 0
 21350  21351  21352 -171  21355 0

c  1+1 --> 2
c    (-b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧  b^{171, 1}_0 ∧  p_171) -> (-b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0)
c  in CNF:
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_2
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨  b^{171, 2}_1
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ -p_171 ∨ -b^{171, 2}_0
c  in DIMACS:
 21350  21351 -21352 -171 -21353 0
 21350  21351 -21352 -171  21354 0
 21350  21351 -21352 -171 -21355 0

c  2+1 --> break 
c    (-b^{171, 1}_2 ∧  b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧  p_171) -> break
c  in CNF:
c     b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ -p_171 ∨ break
c  in DIMACS:
 21350 -21351  21352 -171 1162 0


c  2-1 --> 1
c    (-b^{171, 1}_2 ∧  b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧ -p_171) -> (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0)
c  in CNF:
c     b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_2
c     b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_1
c     b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨  b^{171, 2}_0
c  in DIMACS:
 21350 -21351  21352  171 -21353 0
 21350 -21351  21352  171 -21354 0
 21350 -21351  21352  171  21355 0

c  1-1 --> 0
c    (-b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧  b^{171, 1}_0 ∧ -p_171) -> (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧ -b^{171, 2}_0)
c  in CNF:
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_2
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_1
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_0
c  in DIMACS:
 21350  21351 -21352  171 -21353 0
 21350  21351 -21352  171 -21354 0
 21350  21351 -21352  171 -21355 0

c  0-1 --> -1
c    (-b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧ -p_171) -> ( b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0)
c  in CNF:
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨  b^{171, 2}_2
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_1
c     b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨  b^{171, 2}_0
c  in DIMACS:
 21350  21351  21352  171  21353 0
 21350  21351  21352  171 -21354 0
 21350  21351  21352  171  21355 0

c  -1-1 --> -2
c    ( b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧  b^{171, 1}_0 ∧ -p_171) -> ( b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0)
c  in CNF:
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨  b^{171, 2}_2
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨  b^{171, 2}_1
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨  p_171 ∨ -b^{171, 2}_0
c  in DIMACS:
-21350  21351 -21352  171  21353 0
-21350  21351 -21352  171  21354 0
-21350  21351 -21352  171 -21355 0

c  -2-1 --> break 
c    ( b^{171, 1}_2 ∧  b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧ -p_171) -> break
c  in CNF:
c    -b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨  b^{171, 1}_0 ∨  p_171 ∨ break
c  in DIMACS:
-21350 -21351  21352  171 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 1}_2 ∧ -b^{171, 1}_1 ∧ -b^{171, 1}_0 ∧ true) 
c  in CNF:
c    -b^{171, 1}_2 ∨  b^{171, 1}_1 ∨  b^{171, 1}_0 ∨ false 
c  in DIMACS:
-21350  21351  21352  0

c  3 does not represent an automaton state.
c    -(-b^{171, 1}_2 ∧  b^{171, 1}_1 ∧  b^{171, 1}_0 ∧ true) 
c  in CNF:
c     b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ false 
c  in DIMACS:
 21350 -21351 -21352  0
c  -3 does not represent an automaton state.
c    -( b^{171, 1}_2 ∧  b^{171, 1}_1 ∧  b^{171, 1}_0 ∧ true) 
c  in CNF:
c    -b^{171, 1}_2 ∨ -b^{171, 1}_1 ∨ -b^{171, 1}_0 ∨ false 
c  in DIMACS:
-21350 -21351 -21352  0

c i = 2
c  -2+1 --> -1
c    ( b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧  p_342) -> ( b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0)
c  in CNF:
c    -b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨  b^{171, 3}_2
c    -b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_1
c    -b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨  b^{171, 3}_0
c  in DIMACS:
-21353 -21354  21355 -342  21356 0
-21353 -21354  21355 -342 -21357 0
-21353 -21354  21355 -342  21358 0

c  -1+1 --> 0
c    ( b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0 ∧  p_342) -> (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧ -b^{171, 3}_0)
c  in CNF:
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_2
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_1
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_0
c  in DIMACS:
-21353  21354 -21355 -342 -21356 0
-21353  21354 -21355 -342 -21357 0
-21353  21354 -21355 -342 -21358 0

c  0+1 --> 1
c    (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧  p_342) -> (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0)
c  in CNF:
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_2
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_1
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨  b^{171, 3}_0
c  in DIMACS:
 21353  21354  21355 -342 -21356 0
 21353  21354  21355 -342 -21357 0
 21353  21354  21355 -342  21358 0

c  1+1 --> 2
c    (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0 ∧  p_342) -> (-b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0)
c  in CNF:
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_2
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨  b^{171, 3}_1
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ -p_342 ∨ -b^{171, 3}_0
c  in DIMACS:
 21353  21354 -21355 -342 -21356 0
 21353  21354 -21355 -342  21357 0
 21353  21354 -21355 -342 -21358 0

c  2+1 --> break 
c    (-b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧  p_342) -> break
c  in CNF:
c     b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 21353 -21354  21355 -342 1162 0


c  2-1 --> 1
c    (-b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧ -p_342) -> (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0)
c  in CNF:
c     b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_2
c     b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_1
c     b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨  b^{171, 3}_0
c  in DIMACS:
 21353 -21354  21355  342 -21356 0
 21353 -21354  21355  342 -21357 0
 21353 -21354  21355  342  21358 0

c  1-1 --> 0
c    (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0 ∧ -p_342) -> (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧ -b^{171, 3}_0)
c  in CNF:
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_2
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_1
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_0
c  in DIMACS:
 21353  21354 -21355  342 -21356 0
 21353  21354 -21355  342 -21357 0
 21353  21354 -21355  342 -21358 0

c  0-1 --> -1
c    (-b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧ -p_342) -> ( b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0)
c  in CNF:
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨  b^{171, 3}_2
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_1
c     b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨  b^{171, 3}_0
c  in DIMACS:
 21353  21354  21355  342  21356 0
 21353  21354  21355  342 -21357 0
 21353  21354  21355  342  21358 0

c  -1-1 --> -2
c    ( b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧  b^{171, 2}_0 ∧ -p_342) -> ( b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0)
c  in CNF:
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨  b^{171, 3}_2
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨  b^{171, 3}_1
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨  p_342 ∨ -b^{171, 3}_0
c  in DIMACS:
-21353  21354 -21355  342  21356 0
-21353  21354 -21355  342  21357 0
-21353  21354 -21355  342 -21358 0

c  -2-1 --> break 
c    ( b^{171, 2}_2 ∧  b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨  b^{171, 2}_0 ∨  p_342 ∨ break
c  in DIMACS:
-21353 -21354  21355  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 2}_2 ∧ -b^{171, 2}_1 ∧ -b^{171, 2}_0 ∧ true) 
c  in CNF:
c    -b^{171, 2}_2 ∨  b^{171, 2}_1 ∨  b^{171, 2}_0 ∨ false 
c  in DIMACS:
-21353  21354  21355  0

c  3 does not represent an automaton state.
c    -(-b^{171, 2}_2 ∧  b^{171, 2}_1 ∧  b^{171, 2}_0 ∧ true) 
c  in CNF:
c     b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ false 
c  in DIMACS:
 21353 -21354 -21355  0
c  -3 does not represent an automaton state.
c    -( b^{171, 2}_2 ∧  b^{171, 2}_1 ∧  b^{171, 2}_0 ∧ true) 
c  in CNF:
c    -b^{171, 2}_2 ∨ -b^{171, 2}_1 ∨ -b^{171, 2}_0 ∨ false 
c  in DIMACS:
-21353 -21354 -21355  0

c i = 3
c  -2+1 --> -1
c    ( b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧  p_513) -> ( b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0)
c  in CNF:
c    -b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨  b^{171, 4}_2
c    -b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_1
c    -b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨  b^{171, 4}_0
c  in DIMACS:
-21356 -21357  21358 -513  21359 0
-21356 -21357  21358 -513 -21360 0
-21356 -21357  21358 -513  21361 0

c  -1+1 --> 0
c    ( b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0 ∧  p_513) -> (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧ -b^{171, 4}_0)
c  in CNF:
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_2
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_1
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_0
c  in DIMACS:
-21356  21357 -21358 -513 -21359 0
-21356  21357 -21358 -513 -21360 0
-21356  21357 -21358 -513 -21361 0

c  0+1 --> 1
c    (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧  p_513) -> (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0)
c  in CNF:
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_2
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_1
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨  b^{171, 4}_0
c  in DIMACS:
 21356  21357  21358 -513 -21359 0
 21356  21357  21358 -513 -21360 0
 21356  21357  21358 -513  21361 0

c  1+1 --> 2
c    (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0 ∧  p_513) -> (-b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0)
c  in CNF:
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_2
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨  b^{171, 4}_1
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ -p_513 ∨ -b^{171, 4}_0
c  in DIMACS:
 21356  21357 -21358 -513 -21359 0
 21356  21357 -21358 -513  21360 0
 21356  21357 -21358 -513 -21361 0

c  2+1 --> break 
c    (-b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧  p_513) -> break
c  in CNF:
c     b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ -p_513 ∨ break
c  in DIMACS:
 21356 -21357  21358 -513 1162 0


c  2-1 --> 1
c    (-b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧ -p_513) -> (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0)
c  in CNF:
c     b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_2
c     b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_1
c     b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨  b^{171, 4}_0
c  in DIMACS:
 21356 -21357  21358  513 -21359 0
 21356 -21357  21358  513 -21360 0
 21356 -21357  21358  513  21361 0

c  1-1 --> 0
c    (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0 ∧ -p_513) -> (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧ -b^{171, 4}_0)
c  in CNF:
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_2
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_1
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_0
c  in DIMACS:
 21356  21357 -21358  513 -21359 0
 21356  21357 -21358  513 -21360 0
 21356  21357 -21358  513 -21361 0

c  0-1 --> -1
c    (-b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧ -p_513) -> ( b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0)
c  in CNF:
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨  b^{171, 4}_2
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_1
c     b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨  b^{171, 4}_0
c  in DIMACS:
 21356  21357  21358  513  21359 0
 21356  21357  21358  513 -21360 0
 21356  21357  21358  513  21361 0

c  -1-1 --> -2
c    ( b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧  b^{171, 3}_0 ∧ -p_513) -> ( b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0)
c  in CNF:
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨  b^{171, 4}_2
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨  b^{171, 4}_1
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨  p_513 ∨ -b^{171, 4}_0
c  in DIMACS:
-21356  21357 -21358  513  21359 0
-21356  21357 -21358  513  21360 0
-21356  21357 -21358  513 -21361 0

c  -2-1 --> break 
c    ( b^{171, 3}_2 ∧  b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧ -p_513) -> break
c  in CNF:
c    -b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨  b^{171, 3}_0 ∨  p_513 ∨ break
c  in DIMACS:
-21356 -21357  21358  513 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 3}_2 ∧ -b^{171, 3}_1 ∧ -b^{171, 3}_0 ∧ true) 
c  in CNF:
c    -b^{171, 3}_2 ∨  b^{171, 3}_1 ∨  b^{171, 3}_0 ∨ false 
c  in DIMACS:
-21356  21357  21358  0

c  3 does not represent an automaton state.
c    -(-b^{171, 3}_2 ∧  b^{171, 3}_1 ∧  b^{171, 3}_0 ∧ true) 
c  in CNF:
c     b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ false 
c  in DIMACS:
 21356 -21357 -21358  0
c  -3 does not represent an automaton state.
c    -( b^{171, 3}_2 ∧  b^{171, 3}_1 ∧  b^{171, 3}_0 ∧ true) 
c  in CNF:
c    -b^{171, 3}_2 ∨ -b^{171, 3}_1 ∨ -b^{171, 3}_0 ∨ false 
c  in DIMACS:
-21356 -21357 -21358  0

c i = 4
c  -2+1 --> -1
c    ( b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧  p_684) -> ( b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0)
c  in CNF:
c    -b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨  b^{171, 5}_2
c    -b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_1
c    -b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨  b^{171, 5}_0
c  in DIMACS:
-21359 -21360  21361 -684  21362 0
-21359 -21360  21361 -684 -21363 0
-21359 -21360  21361 -684  21364 0

c  -1+1 --> 0
c    ( b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0 ∧  p_684) -> (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧ -b^{171, 5}_0)
c  in CNF:
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_2
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_1
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_0
c  in DIMACS:
-21359  21360 -21361 -684 -21362 0
-21359  21360 -21361 -684 -21363 0
-21359  21360 -21361 -684 -21364 0

c  0+1 --> 1
c    (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧  p_684) -> (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0)
c  in CNF:
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_2
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_1
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨  b^{171, 5}_0
c  in DIMACS:
 21359  21360  21361 -684 -21362 0
 21359  21360  21361 -684 -21363 0
 21359  21360  21361 -684  21364 0

c  1+1 --> 2
c    (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0 ∧  p_684) -> (-b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0)
c  in CNF:
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_2
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨  b^{171, 5}_1
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ -p_684 ∨ -b^{171, 5}_0
c  in DIMACS:
 21359  21360 -21361 -684 -21362 0
 21359  21360 -21361 -684  21363 0
 21359  21360 -21361 -684 -21364 0

c  2+1 --> break 
c    (-b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧  p_684) -> break
c  in CNF:
c     b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 21359 -21360  21361 -684 1162 0


c  2-1 --> 1
c    (-b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧ -p_684) -> (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0)
c  in CNF:
c     b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_2
c     b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_1
c     b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨  b^{171, 5}_0
c  in DIMACS:
 21359 -21360  21361  684 -21362 0
 21359 -21360  21361  684 -21363 0
 21359 -21360  21361  684  21364 0

c  1-1 --> 0
c    (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0 ∧ -p_684) -> (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧ -b^{171, 5}_0)
c  in CNF:
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_2
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_1
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_0
c  in DIMACS:
 21359  21360 -21361  684 -21362 0
 21359  21360 -21361  684 -21363 0
 21359  21360 -21361  684 -21364 0

c  0-1 --> -1
c    (-b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧ -p_684) -> ( b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0)
c  in CNF:
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨  b^{171, 5}_2
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_1
c     b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨  b^{171, 5}_0
c  in DIMACS:
 21359  21360  21361  684  21362 0
 21359  21360  21361  684 -21363 0
 21359  21360  21361  684  21364 0

c  -1-1 --> -2
c    ( b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧  b^{171, 4}_0 ∧ -p_684) -> ( b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0)
c  in CNF:
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨  b^{171, 5}_2
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨  b^{171, 5}_1
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨  p_684 ∨ -b^{171, 5}_0
c  in DIMACS:
-21359  21360 -21361  684  21362 0
-21359  21360 -21361  684  21363 0
-21359  21360 -21361  684 -21364 0

c  -2-1 --> break 
c    ( b^{171, 4}_2 ∧  b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨  b^{171, 4}_0 ∨  p_684 ∨ break
c  in DIMACS:
-21359 -21360  21361  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 4}_2 ∧ -b^{171, 4}_1 ∧ -b^{171, 4}_0 ∧ true) 
c  in CNF:
c    -b^{171, 4}_2 ∨  b^{171, 4}_1 ∨  b^{171, 4}_0 ∨ false 
c  in DIMACS:
-21359  21360  21361  0

c  3 does not represent an automaton state.
c    -(-b^{171, 4}_2 ∧  b^{171, 4}_1 ∧  b^{171, 4}_0 ∧ true) 
c  in CNF:
c     b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ false 
c  in DIMACS:
 21359 -21360 -21361  0
c  -3 does not represent an automaton state.
c    -( b^{171, 4}_2 ∧  b^{171, 4}_1 ∧  b^{171, 4}_0 ∧ true) 
c  in CNF:
c    -b^{171, 4}_2 ∨ -b^{171, 4}_1 ∨ -b^{171, 4}_0 ∨ false 
c  in DIMACS:
-21359 -21360 -21361  0

c i = 5
c  -2+1 --> -1
c    ( b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧  p_855) -> ( b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0)
c  in CNF:
c    -b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨  b^{171, 6}_2
c    -b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_1
c    -b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨  b^{171, 6}_0
c  in DIMACS:
-21362 -21363  21364 -855  21365 0
-21362 -21363  21364 -855 -21366 0
-21362 -21363  21364 -855  21367 0

c  -1+1 --> 0
c    ( b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0 ∧  p_855) -> (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧ -b^{171, 6}_0)
c  in CNF:
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_2
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_1
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_0
c  in DIMACS:
-21362  21363 -21364 -855 -21365 0
-21362  21363 -21364 -855 -21366 0
-21362  21363 -21364 -855 -21367 0

c  0+1 --> 1
c    (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧  p_855) -> (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0)
c  in CNF:
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_2
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_1
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨  b^{171, 6}_0
c  in DIMACS:
 21362  21363  21364 -855 -21365 0
 21362  21363  21364 -855 -21366 0
 21362  21363  21364 -855  21367 0

c  1+1 --> 2
c    (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0 ∧  p_855) -> (-b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0)
c  in CNF:
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_2
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨  b^{171, 6}_1
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ -p_855 ∨ -b^{171, 6}_0
c  in DIMACS:
 21362  21363 -21364 -855 -21365 0
 21362  21363 -21364 -855  21366 0
 21362  21363 -21364 -855 -21367 0

c  2+1 --> break 
c    (-b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧  p_855) -> break
c  in CNF:
c     b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 21362 -21363  21364 -855 1162 0


c  2-1 --> 1
c    (-b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧ -p_855) -> (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0)
c  in CNF:
c     b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_2
c     b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_1
c     b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨  b^{171, 6}_0
c  in DIMACS:
 21362 -21363  21364  855 -21365 0
 21362 -21363  21364  855 -21366 0
 21362 -21363  21364  855  21367 0

c  1-1 --> 0
c    (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0 ∧ -p_855) -> (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧ -b^{171, 6}_0)
c  in CNF:
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_2
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_1
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_0
c  in DIMACS:
 21362  21363 -21364  855 -21365 0
 21362  21363 -21364  855 -21366 0
 21362  21363 -21364  855 -21367 0

c  0-1 --> -1
c    (-b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧ -p_855) -> ( b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0)
c  in CNF:
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨  b^{171, 6}_2
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_1
c     b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨  b^{171, 6}_0
c  in DIMACS:
 21362  21363  21364  855  21365 0
 21362  21363  21364  855 -21366 0
 21362  21363  21364  855  21367 0

c  -1-1 --> -2
c    ( b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧  b^{171, 5}_0 ∧ -p_855) -> ( b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0)
c  in CNF:
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨  b^{171, 6}_2
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨  b^{171, 6}_1
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨  p_855 ∨ -b^{171, 6}_0
c  in DIMACS:
-21362  21363 -21364  855  21365 0
-21362  21363 -21364  855  21366 0
-21362  21363 -21364  855 -21367 0

c  -2-1 --> break 
c    ( b^{171, 5}_2 ∧  b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨  b^{171, 5}_0 ∨  p_855 ∨ break
c  in DIMACS:
-21362 -21363  21364  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 5}_2 ∧ -b^{171, 5}_1 ∧ -b^{171, 5}_0 ∧ true) 
c  in CNF:
c    -b^{171, 5}_2 ∨  b^{171, 5}_1 ∨  b^{171, 5}_0 ∨ false 
c  in DIMACS:
-21362  21363  21364  0

c  3 does not represent an automaton state.
c    -(-b^{171, 5}_2 ∧  b^{171, 5}_1 ∧  b^{171, 5}_0 ∧ true) 
c  in CNF:
c     b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ false 
c  in DIMACS:
 21362 -21363 -21364  0
c  -3 does not represent an automaton state.
c    -( b^{171, 5}_2 ∧  b^{171, 5}_1 ∧  b^{171, 5}_0 ∧ true) 
c  in CNF:
c    -b^{171, 5}_2 ∨ -b^{171, 5}_1 ∨ -b^{171, 5}_0 ∨ false 
c  in DIMACS:
-21362 -21363 -21364  0

c i = 6
c  -2+1 --> -1
c    ( b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧  p_1026) -> ( b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧  b^{171, 7}_0)
c  in CNF:
c    -b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨  b^{171, 7}_2
c    -b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_1
c    -b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨  b^{171, 7}_0
c  in DIMACS:
-21365 -21366  21367 -1026  21368 0
-21365 -21366  21367 -1026 -21369 0
-21365 -21366  21367 -1026  21370 0

c  -1+1 --> 0
c    ( b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0 ∧  p_1026) -> (-b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧ -b^{171, 7}_0)
c  in CNF:
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_2
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_1
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_0
c  in DIMACS:
-21365  21366 -21367 -1026 -21368 0
-21365  21366 -21367 -1026 -21369 0
-21365  21366 -21367 -1026 -21370 0

c  0+1 --> 1
c    (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧  p_1026) -> (-b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧  b^{171, 7}_0)
c  in CNF:
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_2
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_1
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨  b^{171, 7}_0
c  in DIMACS:
 21365  21366  21367 -1026 -21368 0
 21365  21366  21367 -1026 -21369 0
 21365  21366  21367 -1026  21370 0

c  1+1 --> 2
c    (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0 ∧  p_1026) -> (-b^{171, 7}_2 ∧  b^{171, 7}_1 ∧ -b^{171, 7}_0)
c  in CNF:
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_2
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨  b^{171, 7}_1
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ -p_1026 ∨ -b^{171, 7}_0
c  in DIMACS:
 21365  21366 -21367 -1026 -21368 0
 21365  21366 -21367 -1026  21369 0
 21365  21366 -21367 -1026 -21370 0

c  2+1 --> break 
c    (-b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 21365 -21366  21367 -1026 1162 0


c  2-1 --> 1
c    (-b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧ -p_1026) -> (-b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧  b^{171, 7}_0)
c  in CNF:
c     b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_2
c     b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_1
c     b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨  b^{171, 7}_0
c  in DIMACS:
 21365 -21366  21367  1026 -21368 0
 21365 -21366  21367  1026 -21369 0
 21365 -21366  21367  1026  21370 0

c  1-1 --> 0
c    (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0 ∧ -p_1026) -> (-b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧ -b^{171, 7}_0)
c  in CNF:
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_2
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_1
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_0
c  in DIMACS:
 21365  21366 -21367  1026 -21368 0
 21365  21366 -21367  1026 -21369 0
 21365  21366 -21367  1026 -21370 0

c  0-1 --> -1
c    (-b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧ -p_1026) -> ( b^{171, 7}_2 ∧ -b^{171, 7}_1 ∧  b^{171, 7}_0)
c  in CNF:
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨  b^{171, 7}_2
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_1
c     b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨  b^{171, 7}_0
c  in DIMACS:
 21365  21366  21367  1026  21368 0
 21365  21366  21367  1026 -21369 0
 21365  21366  21367  1026  21370 0

c  -1-1 --> -2
c    ( b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧  b^{171, 6}_0 ∧ -p_1026) -> ( b^{171, 7}_2 ∧  b^{171, 7}_1 ∧ -b^{171, 7}_0)
c  in CNF:
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨  b^{171, 7}_2
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨  b^{171, 7}_1
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨  p_1026 ∨ -b^{171, 7}_0
c  in DIMACS:
-21365  21366 -21367  1026  21368 0
-21365  21366 -21367  1026  21369 0
-21365  21366 -21367  1026 -21370 0

c  -2-1 --> break 
c    ( b^{171, 6}_2 ∧  b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨  b^{171, 6}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-21365 -21366  21367  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{171, 6}_2 ∧ -b^{171, 6}_1 ∧ -b^{171, 6}_0 ∧ true) 
c  in CNF:
c    -b^{171, 6}_2 ∨  b^{171, 6}_1 ∨  b^{171, 6}_0 ∨ false 
c  in DIMACS:
-21365  21366  21367  0

c  3 does not represent an automaton state.
c    -(-b^{171, 6}_2 ∧  b^{171, 6}_1 ∧  b^{171, 6}_0 ∧ true) 
c  in CNF:
c     b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ false 
c  in DIMACS:
 21365 -21366 -21367  0
c  -3 does not represent an automaton state.
c    -( b^{171, 6}_2 ∧  b^{171, 6}_1 ∧  b^{171, 6}_0 ∧ true) 
c  in CNF:
c    -b^{171, 6}_2 ∨ -b^{171, 6}_1 ∨ -b^{171, 6}_0 ∨ false 
c  in DIMACS:
-21365 -21366 -21367  0

c INIT for k = 172
c    -b^{172, 1}_2
c    -b^{172, 1}_1
c    -b^{172, 1}_0
c  in DIMACS:
-21371 0
-21372 0
-21373 0

c Transitions for k = 172
c i = 1
c  -2+1 --> -1
c    ( b^{172, 1}_2 ∧  b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧  p_172) -> ( b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0)
c  in CNF:
c    -b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨  b^{172, 2}_2
c    -b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_1
c    -b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨  b^{172, 2}_0
c  in DIMACS:
-21371 -21372  21373 -172  21374 0
-21371 -21372  21373 -172 -21375 0
-21371 -21372  21373 -172  21376 0

c  -1+1 --> 0
c    ( b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧  b^{172, 1}_0 ∧  p_172) -> (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧ -b^{172, 2}_0)
c  in CNF:
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_2
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_1
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_0
c  in DIMACS:
-21371  21372 -21373 -172 -21374 0
-21371  21372 -21373 -172 -21375 0
-21371  21372 -21373 -172 -21376 0

c  0+1 --> 1
c    (-b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧  p_172) -> (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0)
c  in CNF:
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_2
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_1
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨  b^{172, 2}_0
c  in DIMACS:
 21371  21372  21373 -172 -21374 0
 21371  21372  21373 -172 -21375 0
 21371  21372  21373 -172  21376 0

c  1+1 --> 2
c    (-b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧  b^{172, 1}_0 ∧  p_172) -> (-b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0)
c  in CNF:
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_2
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨  b^{172, 2}_1
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ -p_172 ∨ -b^{172, 2}_0
c  in DIMACS:
 21371  21372 -21373 -172 -21374 0
 21371  21372 -21373 -172  21375 0
 21371  21372 -21373 -172 -21376 0

c  2+1 --> break 
c    (-b^{172, 1}_2 ∧  b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧  p_172) -> break
c  in CNF:
c     b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ -p_172 ∨ break
c  in DIMACS:
 21371 -21372  21373 -172 1162 0


c  2-1 --> 1
c    (-b^{172, 1}_2 ∧  b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧ -p_172) -> (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0)
c  in CNF:
c     b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_2
c     b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_1
c     b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨  b^{172, 2}_0
c  in DIMACS:
 21371 -21372  21373  172 -21374 0
 21371 -21372  21373  172 -21375 0
 21371 -21372  21373  172  21376 0

c  1-1 --> 0
c    (-b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧  b^{172, 1}_0 ∧ -p_172) -> (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧ -b^{172, 2}_0)
c  in CNF:
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_2
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_1
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_0
c  in DIMACS:
 21371  21372 -21373  172 -21374 0
 21371  21372 -21373  172 -21375 0
 21371  21372 -21373  172 -21376 0

c  0-1 --> -1
c    (-b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧ -p_172) -> ( b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0)
c  in CNF:
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨  b^{172, 2}_2
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_1
c     b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨  b^{172, 2}_0
c  in DIMACS:
 21371  21372  21373  172  21374 0
 21371  21372  21373  172 -21375 0
 21371  21372  21373  172  21376 0

c  -1-1 --> -2
c    ( b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧  b^{172, 1}_0 ∧ -p_172) -> ( b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0)
c  in CNF:
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨  b^{172, 2}_2
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨  b^{172, 2}_1
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨  p_172 ∨ -b^{172, 2}_0
c  in DIMACS:
-21371  21372 -21373  172  21374 0
-21371  21372 -21373  172  21375 0
-21371  21372 -21373  172 -21376 0

c  -2-1 --> break 
c    ( b^{172, 1}_2 ∧  b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧ -p_172) -> break
c  in CNF:
c    -b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨  b^{172, 1}_0 ∨  p_172 ∨ break
c  in DIMACS:
-21371 -21372  21373  172 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 1}_2 ∧ -b^{172, 1}_1 ∧ -b^{172, 1}_0 ∧ true) 
c  in CNF:
c    -b^{172, 1}_2 ∨  b^{172, 1}_1 ∨  b^{172, 1}_0 ∨ false 
c  in DIMACS:
-21371  21372  21373  0

c  3 does not represent an automaton state.
c    -(-b^{172, 1}_2 ∧  b^{172, 1}_1 ∧  b^{172, 1}_0 ∧ true) 
c  in CNF:
c     b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ false 
c  in DIMACS:
 21371 -21372 -21373  0
c  -3 does not represent an automaton state.
c    -( b^{172, 1}_2 ∧  b^{172, 1}_1 ∧  b^{172, 1}_0 ∧ true) 
c  in CNF:
c    -b^{172, 1}_2 ∨ -b^{172, 1}_1 ∨ -b^{172, 1}_0 ∨ false 
c  in DIMACS:
-21371 -21372 -21373  0

c i = 2
c  -2+1 --> -1
c    ( b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧  p_344) -> ( b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0)
c  in CNF:
c    -b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨  b^{172, 3}_2
c    -b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_1
c    -b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨  b^{172, 3}_0
c  in DIMACS:
-21374 -21375  21376 -344  21377 0
-21374 -21375  21376 -344 -21378 0
-21374 -21375  21376 -344  21379 0

c  -1+1 --> 0
c    ( b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0 ∧  p_344) -> (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧ -b^{172, 3}_0)
c  in CNF:
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_2
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_1
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_0
c  in DIMACS:
-21374  21375 -21376 -344 -21377 0
-21374  21375 -21376 -344 -21378 0
-21374  21375 -21376 -344 -21379 0

c  0+1 --> 1
c    (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧  p_344) -> (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0)
c  in CNF:
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_2
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_1
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨  b^{172, 3}_0
c  in DIMACS:
 21374  21375  21376 -344 -21377 0
 21374  21375  21376 -344 -21378 0
 21374  21375  21376 -344  21379 0

c  1+1 --> 2
c    (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0 ∧  p_344) -> (-b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0)
c  in CNF:
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_2
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨  b^{172, 3}_1
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ -p_344 ∨ -b^{172, 3}_0
c  in DIMACS:
 21374  21375 -21376 -344 -21377 0
 21374  21375 -21376 -344  21378 0
 21374  21375 -21376 -344 -21379 0

c  2+1 --> break 
c    (-b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧  p_344) -> break
c  in CNF:
c     b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 21374 -21375  21376 -344 1162 0


c  2-1 --> 1
c    (-b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧ -p_344) -> (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0)
c  in CNF:
c     b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_2
c     b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_1
c     b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨  b^{172, 3}_0
c  in DIMACS:
 21374 -21375  21376  344 -21377 0
 21374 -21375  21376  344 -21378 0
 21374 -21375  21376  344  21379 0

c  1-1 --> 0
c    (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0 ∧ -p_344) -> (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧ -b^{172, 3}_0)
c  in CNF:
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_2
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_1
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_0
c  in DIMACS:
 21374  21375 -21376  344 -21377 0
 21374  21375 -21376  344 -21378 0
 21374  21375 -21376  344 -21379 0

c  0-1 --> -1
c    (-b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧ -p_344) -> ( b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0)
c  in CNF:
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨  b^{172, 3}_2
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_1
c     b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨  b^{172, 3}_0
c  in DIMACS:
 21374  21375  21376  344  21377 0
 21374  21375  21376  344 -21378 0
 21374  21375  21376  344  21379 0

c  -1-1 --> -2
c    ( b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧  b^{172, 2}_0 ∧ -p_344) -> ( b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0)
c  in CNF:
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨  b^{172, 3}_2
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨  b^{172, 3}_1
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨  p_344 ∨ -b^{172, 3}_0
c  in DIMACS:
-21374  21375 -21376  344  21377 0
-21374  21375 -21376  344  21378 0
-21374  21375 -21376  344 -21379 0

c  -2-1 --> break 
c    ( b^{172, 2}_2 ∧  b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨  b^{172, 2}_0 ∨  p_344 ∨ break
c  in DIMACS:
-21374 -21375  21376  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 2}_2 ∧ -b^{172, 2}_1 ∧ -b^{172, 2}_0 ∧ true) 
c  in CNF:
c    -b^{172, 2}_2 ∨  b^{172, 2}_1 ∨  b^{172, 2}_0 ∨ false 
c  in DIMACS:
-21374  21375  21376  0

c  3 does not represent an automaton state.
c    -(-b^{172, 2}_2 ∧  b^{172, 2}_1 ∧  b^{172, 2}_0 ∧ true) 
c  in CNF:
c     b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ false 
c  in DIMACS:
 21374 -21375 -21376  0
c  -3 does not represent an automaton state.
c    -( b^{172, 2}_2 ∧  b^{172, 2}_1 ∧  b^{172, 2}_0 ∧ true) 
c  in CNF:
c    -b^{172, 2}_2 ∨ -b^{172, 2}_1 ∨ -b^{172, 2}_0 ∨ false 
c  in DIMACS:
-21374 -21375 -21376  0

c i = 3
c  -2+1 --> -1
c    ( b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧  p_516) -> ( b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0)
c  in CNF:
c    -b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨  b^{172, 4}_2
c    -b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_1
c    -b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨  b^{172, 4}_0
c  in DIMACS:
-21377 -21378  21379 -516  21380 0
-21377 -21378  21379 -516 -21381 0
-21377 -21378  21379 -516  21382 0

c  -1+1 --> 0
c    ( b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0 ∧  p_516) -> (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧ -b^{172, 4}_0)
c  in CNF:
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_2
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_1
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_0
c  in DIMACS:
-21377  21378 -21379 -516 -21380 0
-21377  21378 -21379 -516 -21381 0
-21377  21378 -21379 -516 -21382 0

c  0+1 --> 1
c    (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧  p_516) -> (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0)
c  in CNF:
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_2
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_1
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨  b^{172, 4}_0
c  in DIMACS:
 21377  21378  21379 -516 -21380 0
 21377  21378  21379 -516 -21381 0
 21377  21378  21379 -516  21382 0

c  1+1 --> 2
c    (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0 ∧  p_516) -> (-b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0)
c  in CNF:
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_2
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨  b^{172, 4}_1
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ -p_516 ∨ -b^{172, 4}_0
c  in DIMACS:
 21377  21378 -21379 -516 -21380 0
 21377  21378 -21379 -516  21381 0
 21377  21378 -21379 -516 -21382 0

c  2+1 --> break 
c    (-b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧  p_516) -> break
c  in CNF:
c     b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 21377 -21378  21379 -516 1162 0


c  2-1 --> 1
c    (-b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧ -p_516) -> (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0)
c  in CNF:
c     b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_2
c     b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_1
c     b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨  b^{172, 4}_0
c  in DIMACS:
 21377 -21378  21379  516 -21380 0
 21377 -21378  21379  516 -21381 0
 21377 -21378  21379  516  21382 0

c  1-1 --> 0
c    (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0 ∧ -p_516) -> (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧ -b^{172, 4}_0)
c  in CNF:
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_2
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_1
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_0
c  in DIMACS:
 21377  21378 -21379  516 -21380 0
 21377  21378 -21379  516 -21381 0
 21377  21378 -21379  516 -21382 0

c  0-1 --> -1
c    (-b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧ -p_516) -> ( b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0)
c  in CNF:
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨  b^{172, 4}_2
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_1
c     b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨  b^{172, 4}_0
c  in DIMACS:
 21377  21378  21379  516  21380 0
 21377  21378  21379  516 -21381 0
 21377  21378  21379  516  21382 0

c  -1-1 --> -2
c    ( b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧  b^{172, 3}_0 ∧ -p_516) -> ( b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0)
c  in CNF:
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨  b^{172, 4}_2
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨  b^{172, 4}_1
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨  p_516 ∨ -b^{172, 4}_0
c  in DIMACS:
-21377  21378 -21379  516  21380 0
-21377  21378 -21379  516  21381 0
-21377  21378 -21379  516 -21382 0

c  -2-1 --> break 
c    ( b^{172, 3}_2 ∧  b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨  b^{172, 3}_0 ∨  p_516 ∨ break
c  in DIMACS:
-21377 -21378  21379  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 3}_2 ∧ -b^{172, 3}_1 ∧ -b^{172, 3}_0 ∧ true) 
c  in CNF:
c    -b^{172, 3}_2 ∨  b^{172, 3}_1 ∨  b^{172, 3}_0 ∨ false 
c  in DIMACS:
-21377  21378  21379  0

c  3 does not represent an automaton state.
c    -(-b^{172, 3}_2 ∧  b^{172, 3}_1 ∧  b^{172, 3}_0 ∧ true) 
c  in CNF:
c     b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ false 
c  in DIMACS:
 21377 -21378 -21379  0
c  -3 does not represent an automaton state.
c    -( b^{172, 3}_2 ∧  b^{172, 3}_1 ∧  b^{172, 3}_0 ∧ true) 
c  in CNF:
c    -b^{172, 3}_2 ∨ -b^{172, 3}_1 ∨ -b^{172, 3}_0 ∨ false 
c  in DIMACS:
-21377 -21378 -21379  0

c i = 4
c  -2+1 --> -1
c    ( b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧  p_688) -> ( b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0)
c  in CNF:
c    -b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨  b^{172, 5}_2
c    -b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_1
c    -b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨  b^{172, 5}_0
c  in DIMACS:
-21380 -21381  21382 -688  21383 0
-21380 -21381  21382 -688 -21384 0
-21380 -21381  21382 -688  21385 0

c  -1+1 --> 0
c    ( b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0 ∧  p_688) -> (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧ -b^{172, 5}_0)
c  in CNF:
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_2
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_1
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_0
c  in DIMACS:
-21380  21381 -21382 -688 -21383 0
-21380  21381 -21382 -688 -21384 0
-21380  21381 -21382 -688 -21385 0

c  0+1 --> 1
c    (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧  p_688) -> (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0)
c  in CNF:
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_2
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_1
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨  b^{172, 5}_0
c  in DIMACS:
 21380  21381  21382 -688 -21383 0
 21380  21381  21382 -688 -21384 0
 21380  21381  21382 -688  21385 0

c  1+1 --> 2
c    (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0 ∧  p_688) -> (-b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0)
c  in CNF:
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_2
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨  b^{172, 5}_1
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ -p_688 ∨ -b^{172, 5}_0
c  in DIMACS:
 21380  21381 -21382 -688 -21383 0
 21380  21381 -21382 -688  21384 0
 21380  21381 -21382 -688 -21385 0

c  2+1 --> break 
c    (-b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧  p_688) -> break
c  in CNF:
c     b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 21380 -21381  21382 -688 1162 0


c  2-1 --> 1
c    (-b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧ -p_688) -> (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0)
c  in CNF:
c     b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_2
c     b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_1
c     b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨  b^{172, 5}_0
c  in DIMACS:
 21380 -21381  21382  688 -21383 0
 21380 -21381  21382  688 -21384 0
 21380 -21381  21382  688  21385 0

c  1-1 --> 0
c    (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0 ∧ -p_688) -> (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧ -b^{172, 5}_0)
c  in CNF:
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_2
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_1
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_0
c  in DIMACS:
 21380  21381 -21382  688 -21383 0
 21380  21381 -21382  688 -21384 0
 21380  21381 -21382  688 -21385 0

c  0-1 --> -1
c    (-b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧ -p_688) -> ( b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0)
c  in CNF:
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨  b^{172, 5}_2
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_1
c     b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨  b^{172, 5}_0
c  in DIMACS:
 21380  21381  21382  688  21383 0
 21380  21381  21382  688 -21384 0
 21380  21381  21382  688  21385 0

c  -1-1 --> -2
c    ( b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧  b^{172, 4}_0 ∧ -p_688) -> ( b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0)
c  in CNF:
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨  b^{172, 5}_2
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨  b^{172, 5}_1
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨  p_688 ∨ -b^{172, 5}_0
c  in DIMACS:
-21380  21381 -21382  688  21383 0
-21380  21381 -21382  688  21384 0
-21380  21381 -21382  688 -21385 0

c  -2-1 --> break 
c    ( b^{172, 4}_2 ∧  b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨  b^{172, 4}_0 ∨  p_688 ∨ break
c  in DIMACS:
-21380 -21381  21382  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 4}_2 ∧ -b^{172, 4}_1 ∧ -b^{172, 4}_0 ∧ true) 
c  in CNF:
c    -b^{172, 4}_2 ∨  b^{172, 4}_1 ∨  b^{172, 4}_0 ∨ false 
c  in DIMACS:
-21380  21381  21382  0

c  3 does not represent an automaton state.
c    -(-b^{172, 4}_2 ∧  b^{172, 4}_1 ∧  b^{172, 4}_0 ∧ true) 
c  in CNF:
c     b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ false 
c  in DIMACS:
 21380 -21381 -21382  0
c  -3 does not represent an automaton state.
c    -( b^{172, 4}_2 ∧  b^{172, 4}_1 ∧  b^{172, 4}_0 ∧ true) 
c  in CNF:
c    -b^{172, 4}_2 ∨ -b^{172, 4}_1 ∨ -b^{172, 4}_0 ∨ false 
c  in DIMACS:
-21380 -21381 -21382  0

c i = 5
c  -2+1 --> -1
c    ( b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧  p_860) -> ( b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0)
c  in CNF:
c    -b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨  b^{172, 6}_2
c    -b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_1
c    -b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨  b^{172, 6}_0
c  in DIMACS:
-21383 -21384  21385 -860  21386 0
-21383 -21384  21385 -860 -21387 0
-21383 -21384  21385 -860  21388 0

c  -1+1 --> 0
c    ( b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0 ∧  p_860) -> (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧ -b^{172, 6}_0)
c  in CNF:
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_2
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_1
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_0
c  in DIMACS:
-21383  21384 -21385 -860 -21386 0
-21383  21384 -21385 -860 -21387 0
-21383  21384 -21385 -860 -21388 0

c  0+1 --> 1
c    (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧  p_860) -> (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0)
c  in CNF:
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_2
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_1
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨  b^{172, 6}_0
c  in DIMACS:
 21383  21384  21385 -860 -21386 0
 21383  21384  21385 -860 -21387 0
 21383  21384  21385 -860  21388 0

c  1+1 --> 2
c    (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0 ∧  p_860) -> (-b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0)
c  in CNF:
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_2
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨  b^{172, 6}_1
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ -p_860 ∨ -b^{172, 6}_0
c  in DIMACS:
 21383  21384 -21385 -860 -21386 0
 21383  21384 -21385 -860  21387 0
 21383  21384 -21385 -860 -21388 0

c  2+1 --> break 
c    (-b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧  p_860) -> break
c  in CNF:
c     b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 21383 -21384  21385 -860 1162 0


c  2-1 --> 1
c    (-b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧ -p_860) -> (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0)
c  in CNF:
c     b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_2
c     b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_1
c     b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨  b^{172, 6}_0
c  in DIMACS:
 21383 -21384  21385  860 -21386 0
 21383 -21384  21385  860 -21387 0
 21383 -21384  21385  860  21388 0

c  1-1 --> 0
c    (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0 ∧ -p_860) -> (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧ -b^{172, 6}_0)
c  in CNF:
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_2
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_1
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_0
c  in DIMACS:
 21383  21384 -21385  860 -21386 0
 21383  21384 -21385  860 -21387 0
 21383  21384 -21385  860 -21388 0

c  0-1 --> -1
c    (-b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧ -p_860) -> ( b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0)
c  in CNF:
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨  b^{172, 6}_2
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_1
c     b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨  b^{172, 6}_0
c  in DIMACS:
 21383  21384  21385  860  21386 0
 21383  21384  21385  860 -21387 0
 21383  21384  21385  860  21388 0

c  -1-1 --> -2
c    ( b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧  b^{172, 5}_0 ∧ -p_860) -> ( b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0)
c  in CNF:
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨  b^{172, 6}_2
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨  b^{172, 6}_1
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨  p_860 ∨ -b^{172, 6}_0
c  in DIMACS:
-21383  21384 -21385  860  21386 0
-21383  21384 -21385  860  21387 0
-21383  21384 -21385  860 -21388 0

c  -2-1 --> break 
c    ( b^{172, 5}_2 ∧  b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨  b^{172, 5}_0 ∨  p_860 ∨ break
c  in DIMACS:
-21383 -21384  21385  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 5}_2 ∧ -b^{172, 5}_1 ∧ -b^{172, 5}_0 ∧ true) 
c  in CNF:
c    -b^{172, 5}_2 ∨  b^{172, 5}_1 ∨  b^{172, 5}_0 ∨ false 
c  in DIMACS:
-21383  21384  21385  0

c  3 does not represent an automaton state.
c    -(-b^{172, 5}_2 ∧  b^{172, 5}_1 ∧  b^{172, 5}_0 ∧ true) 
c  in CNF:
c     b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ false 
c  in DIMACS:
 21383 -21384 -21385  0
c  -3 does not represent an automaton state.
c    -( b^{172, 5}_2 ∧  b^{172, 5}_1 ∧  b^{172, 5}_0 ∧ true) 
c  in CNF:
c    -b^{172, 5}_2 ∨ -b^{172, 5}_1 ∨ -b^{172, 5}_0 ∨ false 
c  in DIMACS:
-21383 -21384 -21385  0

c i = 6
c  -2+1 --> -1
c    ( b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧  p_1032) -> ( b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧  b^{172, 7}_0)
c  in CNF:
c    -b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨  b^{172, 7}_2
c    -b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_1
c    -b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨  b^{172, 7}_0
c  in DIMACS:
-21386 -21387  21388 -1032  21389 0
-21386 -21387  21388 -1032 -21390 0
-21386 -21387  21388 -1032  21391 0

c  -1+1 --> 0
c    ( b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0 ∧  p_1032) -> (-b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧ -b^{172, 7}_0)
c  in CNF:
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_2
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_1
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_0
c  in DIMACS:
-21386  21387 -21388 -1032 -21389 0
-21386  21387 -21388 -1032 -21390 0
-21386  21387 -21388 -1032 -21391 0

c  0+1 --> 1
c    (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧  p_1032) -> (-b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧  b^{172, 7}_0)
c  in CNF:
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_2
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_1
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨  b^{172, 7}_0
c  in DIMACS:
 21386  21387  21388 -1032 -21389 0
 21386  21387  21388 -1032 -21390 0
 21386  21387  21388 -1032  21391 0

c  1+1 --> 2
c    (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0 ∧  p_1032) -> (-b^{172, 7}_2 ∧  b^{172, 7}_1 ∧ -b^{172, 7}_0)
c  in CNF:
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_2
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨  b^{172, 7}_1
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ -p_1032 ∨ -b^{172, 7}_0
c  in DIMACS:
 21386  21387 -21388 -1032 -21389 0
 21386  21387 -21388 -1032  21390 0
 21386  21387 -21388 -1032 -21391 0

c  2+1 --> break 
c    (-b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 21386 -21387  21388 -1032 1162 0


c  2-1 --> 1
c    (-b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧ -p_1032) -> (-b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧  b^{172, 7}_0)
c  in CNF:
c     b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_2
c     b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_1
c     b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨  b^{172, 7}_0
c  in DIMACS:
 21386 -21387  21388  1032 -21389 0
 21386 -21387  21388  1032 -21390 0
 21386 -21387  21388  1032  21391 0

c  1-1 --> 0
c    (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0 ∧ -p_1032) -> (-b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧ -b^{172, 7}_0)
c  in CNF:
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_2
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_1
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_0
c  in DIMACS:
 21386  21387 -21388  1032 -21389 0
 21386  21387 -21388  1032 -21390 0
 21386  21387 -21388  1032 -21391 0

c  0-1 --> -1
c    (-b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧ -p_1032) -> ( b^{172, 7}_2 ∧ -b^{172, 7}_1 ∧  b^{172, 7}_0)
c  in CNF:
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨  b^{172, 7}_2
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_1
c     b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨  b^{172, 7}_0
c  in DIMACS:
 21386  21387  21388  1032  21389 0
 21386  21387  21388  1032 -21390 0
 21386  21387  21388  1032  21391 0

c  -1-1 --> -2
c    ( b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧  b^{172, 6}_0 ∧ -p_1032) -> ( b^{172, 7}_2 ∧  b^{172, 7}_1 ∧ -b^{172, 7}_0)
c  in CNF:
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨  b^{172, 7}_2
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨  b^{172, 7}_1
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨  p_1032 ∨ -b^{172, 7}_0
c  in DIMACS:
-21386  21387 -21388  1032  21389 0
-21386  21387 -21388  1032  21390 0
-21386  21387 -21388  1032 -21391 0

c  -2-1 --> break 
c    ( b^{172, 6}_2 ∧  b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨  b^{172, 6}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-21386 -21387  21388  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{172, 6}_2 ∧ -b^{172, 6}_1 ∧ -b^{172, 6}_0 ∧ true) 
c  in CNF:
c    -b^{172, 6}_2 ∨  b^{172, 6}_1 ∨  b^{172, 6}_0 ∨ false 
c  in DIMACS:
-21386  21387  21388  0

c  3 does not represent an automaton state.
c    -(-b^{172, 6}_2 ∧  b^{172, 6}_1 ∧  b^{172, 6}_0 ∧ true) 
c  in CNF:
c     b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ false 
c  in DIMACS:
 21386 -21387 -21388  0
c  -3 does not represent an automaton state.
c    -( b^{172, 6}_2 ∧  b^{172, 6}_1 ∧  b^{172, 6}_0 ∧ true) 
c  in CNF:
c    -b^{172, 6}_2 ∨ -b^{172, 6}_1 ∨ -b^{172, 6}_0 ∨ false 
c  in DIMACS:
-21386 -21387 -21388  0

c INIT for k = 173
c    -b^{173, 1}_2
c    -b^{173, 1}_1
c    -b^{173, 1}_0
c  in DIMACS:
-21392 0
-21393 0
-21394 0

c Transitions for k = 173
c i = 1
c  -2+1 --> -1
c    ( b^{173, 1}_2 ∧  b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧  p_173) -> ( b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0)
c  in CNF:
c    -b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨  b^{173, 2}_2
c    -b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_1
c    -b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨  b^{173, 2}_0
c  in DIMACS:
-21392 -21393  21394 -173  21395 0
-21392 -21393  21394 -173 -21396 0
-21392 -21393  21394 -173  21397 0

c  -1+1 --> 0
c    ( b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧  b^{173, 1}_0 ∧  p_173) -> (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧ -b^{173, 2}_0)
c  in CNF:
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_2
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_1
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_0
c  in DIMACS:
-21392  21393 -21394 -173 -21395 0
-21392  21393 -21394 -173 -21396 0
-21392  21393 -21394 -173 -21397 0

c  0+1 --> 1
c    (-b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧  p_173) -> (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0)
c  in CNF:
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_2
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_1
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨  b^{173, 2}_0
c  in DIMACS:
 21392  21393  21394 -173 -21395 0
 21392  21393  21394 -173 -21396 0
 21392  21393  21394 -173  21397 0

c  1+1 --> 2
c    (-b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧  b^{173, 1}_0 ∧  p_173) -> (-b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0)
c  in CNF:
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_2
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨  b^{173, 2}_1
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ -p_173 ∨ -b^{173, 2}_0
c  in DIMACS:
 21392  21393 -21394 -173 -21395 0
 21392  21393 -21394 -173  21396 0
 21392  21393 -21394 -173 -21397 0

c  2+1 --> break 
c    (-b^{173, 1}_2 ∧  b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧  p_173) -> break
c  in CNF:
c     b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ -p_173 ∨ break
c  in DIMACS:
 21392 -21393  21394 -173 1162 0


c  2-1 --> 1
c    (-b^{173, 1}_2 ∧  b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧ -p_173) -> (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0)
c  in CNF:
c     b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_2
c     b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_1
c     b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨  b^{173, 2}_0
c  in DIMACS:
 21392 -21393  21394  173 -21395 0
 21392 -21393  21394  173 -21396 0
 21392 -21393  21394  173  21397 0

c  1-1 --> 0
c    (-b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧  b^{173, 1}_0 ∧ -p_173) -> (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧ -b^{173, 2}_0)
c  in CNF:
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_2
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_1
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_0
c  in DIMACS:
 21392  21393 -21394  173 -21395 0
 21392  21393 -21394  173 -21396 0
 21392  21393 -21394  173 -21397 0

c  0-1 --> -1
c    (-b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧ -p_173) -> ( b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0)
c  in CNF:
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨  b^{173, 2}_2
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_1
c     b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨  b^{173, 2}_0
c  in DIMACS:
 21392  21393  21394  173  21395 0
 21392  21393  21394  173 -21396 0
 21392  21393  21394  173  21397 0

c  -1-1 --> -2
c    ( b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧  b^{173, 1}_0 ∧ -p_173) -> ( b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0)
c  in CNF:
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨  b^{173, 2}_2
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨  b^{173, 2}_1
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨  p_173 ∨ -b^{173, 2}_0
c  in DIMACS:
-21392  21393 -21394  173  21395 0
-21392  21393 -21394  173  21396 0
-21392  21393 -21394  173 -21397 0

c  -2-1 --> break 
c    ( b^{173, 1}_2 ∧  b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧ -p_173) -> break
c  in CNF:
c    -b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨  b^{173, 1}_0 ∨  p_173 ∨ break
c  in DIMACS:
-21392 -21393  21394  173 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 1}_2 ∧ -b^{173, 1}_1 ∧ -b^{173, 1}_0 ∧ true) 
c  in CNF:
c    -b^{173, 1}_2 ∨  b^{173, 1}_1 ∨  b^{173, 1}_0 ∨ false 
c  in DIMACS:
-21392  21393  21394  0

c  3 does not represent an automaton state.
c    -(-b^{173, 1}_2 ∧  b^{173, 1}_1 ∧  b^{173, 1}_0 ∧ true) 
c  in CNF:
c     b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ false 
c  in DIMACS:
 21392 -21393 -21394  0
c  -3 does not represent an automaton state.
c    -( b^{173, 1}_2 ∧  b^{173, 1}_1 ∧  b^{173, 1}_0 ∧ true) 
c  in CNF:
c    -b^{173, 1}_2 ∨ -b^{173, 1}_1 ∨ -b^{173, 1}_0 ∨ false 
c  in DIMACS:
-21392 -21393 -21394  0

c i = 2
c  -2+1 --> -1
c    ( b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧  p_346) -> ( b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0)
c  in CNF:
c    -b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨  b^{173, 3}_2
c    -b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_1
c    -b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨  b^{173, 3}_0
c  in DIMACS:
-21395 -21396  21397 -346  21398 0
-21395 -21396  21397 -346 -21399 0
-21395 -21396  21397 -346  21400 0

c  -1+1 --> 0
c    ( b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0 ∧  p_346) -> (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧ -b^{173, 3}_0)
c  in CNF:
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_2
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_1
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_0
c  in DIMACS:
-21395  21396 -21397 -346 -21398 0
-21395  21396 -21397 -346 -21399 0
-21395  21396 -21397 -346 -21400 0

c  0+1 --> 1
c    (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧  p_346) -> (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0)
c  in CNF:
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_2
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_1
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨  b^{173, 3}_0
c  in DIMACS:
 21395  21396  21397 -346 -21398 0
 21395  21396  21397 -346 -21399 0
 21395  21396  21397 -346  21400 0

c  1+1 --> 2
c    (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0 ∧  p_346) -> (-b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0)
c  in CNF:
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_2
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨  b^{173, 3}_1
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ -p_346 ∨ -b^{173, 3}_0
c  in DIMACS:
 21395  21396 -21397 -346 -21398 0
 21395  21396 -21397 -346  21399 0
 21395  21396 -21397 -346 -21400 0

c  2+1 --> break 
c    (-b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧  p_346) -> break
c  in CNF:
c     b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ -p_346 ∨ break
c  in DIMACS:
 21395 -21396  21397 -346 1162 0


c  2-1 --> 1
c    (-b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧ -p_346) -> (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0)
c  in CNF:
c     b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_2
c     b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_1
c     b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨  b^{173, 3}_0
c  in DIMACS:
 21395 -21396  21397  346 -21398 0
 21395 -21396  21397  346 -21399 0
 21395 -21396  21397  346  21400 0

c  1-1 --> 0
c    (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0 ∧ -p_346) -> (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧ -b^{173, 3}_0)
c  in CNF:
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_2
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_1
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_0
c  in DIMACS:
 21395  21396 -21397  346 -21398 0
 21395  21396 -21397  346 -21399 0
 21395  21396 -21397  346 -21400 0

c  0-1 --> -1
c    (-b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧ -p_346) -> ( b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0)
c  in CNF:
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨  b^{173, 3}_2
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_1
c     b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨  b^{173, 3}_0
c  in DIMACS:
 21395  21396  21397  346  21398 0
 21395  21396  21397  346 -21399 0
 21395  21396  21397  346  21400 0

c  -1-1 --> -2
c    ( b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧  b^{173, 2}_0 ∧ -p_346) -> ( b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0)
c  in CNF:
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨  b^{173, 3}_2
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨  b^{173, 3}_1
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨  p_346 ∨ -b^{173, 3}_0
c  in DIMACS:
-21395  21396 -21397  346  21398 0
-21395  21396 -21397  346  21399 0
-21395  21396 -21397  346 -21400 0

c  -2-1 --> break 
c    ( b^{173, 2}_2 ∧  b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧ -p_346) -> break
c  in CNF:
c    -b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨  b^{173, 2}_0 ∨  p_346 ∨ break
c  in DIMACS:
-21395 -21396  21397  346 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 2}_2 ∧ -b^{173, 2}_1 ∧ -b^{173, 2}_0 ∧ true) 
c  in CNF:
c    -b^{173, 2}_2 ∨  b^{173, 2}_1 ∨  b^{173, 2}_0 ∨ false 
c  in DIMACS:
-21395  21396  21397  0

c  3 does not represent an automaton state.
c    -(-b^{173, 2}_2 ∧  b^{173, 2}_1 ∧  b^{173, 2}_0 ∧ true) 
c  in CNF:
c     b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ false 
c  in DIMACS:
 21395 -21396 -21397  0
c  -3 does not represent an automaton state.
c    -( b^{173, 2}_2 ∧  b^{173, 2}_1 ∧  b^{173, 2}_0 ∧ true) 
c  in CNF:
c    -b^{173, 2}_2 ∨ -b^{173, 2}_1 ∨ -b^{173, 2}_0 ∨ false 
c  in DIMACS:
-21395 -21396 -21397  0

c i = 3
c  -2+1 --> -1
c    ( b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧  p_519) -> ( b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0)
c  in CNF:
c    -b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨  b^{173, 4}_2
c    -b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_1
c    -b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨  b^{173, 4}_0
c  in DIMACS:
-21398 -21399  21400 -519  21401 0
-21398 -21399  21400 -519 -21402 0
-21398 -21399  21400 -519  21403 0

c  -1+1 --> 0
c    ( b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0 ∧  p_519) -> (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧ -b^{173, 4}_0)
c  in CNF:
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_2
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_1
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_0
c  in DIMACS:
-21398  21399 -21400 -519 -21401 0
-21398  21399 -21400 -519 -21402 0
-21398  21399 -21400 -519 -21403 0

c  0+1 --> 1
c    (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧  p_519) -> (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0)
c  in CNF:
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_2
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_1
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨  b^{173, 4}_0
c  in DIMACS:
 21398  21399  21400 -519 -21401 0
 21398  21399  21400 -519 -21402 0
 21398  21399  21400 -519  21403 0

c  1+1 --> 2
c    (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0 ∧  p_519) -> (-b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0)
c  in CNF:
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_2
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨  b^{173, 4}_1
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ -p_519 ∨ -b^{173, 4}_0
c  in DIMACS:
 21398  21399 -21400 -519 -21401 0
 21398  21399 -21400 -519  21402 0
 21398  21399 -21400 -519 -21403 0

c  2+1 --> break 
c    (-b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧  p_519) -> break
c  in CNF:
c     b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ -p_519 ∨ break
c  in DIMACS:
 21398 -21399  21400 -519 1162 0


c  2-1 --> 1
c    (-b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧ -p_519) -> (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0)
c  in CNF:
c     b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_2
c     b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_1
c     b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨  b^{173, 4}_0
c  in DIMACS:
 21398 -21399  21400  519 -21401 0
 21398 -21399  21400  519 -21402 0
 21398 -21399  21400  519  21403 0

c  1-1 --> 0
c    (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0 ∧ -p_519) -> (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧ -b^{173, 4}_0)
c  in CNF:
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_2
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_1
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_0
c  in DIMACS:
 21398  21399 -21400  519 -21401 0
 21398  21399 -21400  519 -21402 0
 21398  21399 -21400  519 -21403 0

c  0-1 --> -1
c    (-b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧ -p_519) -> ( b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0)
c  in CNF:
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨  b^{173, 4}_2
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_1
c     b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨  b^{173, 4}_0
c  in DIMACS:
 21398  21399  21400  519  21401 0
 21398  21399  21400  519 -21402 0
 21398  21399  21400  519  21403 0

c  -1-1 --> -2
c    ( b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧  b^{173, 3}_0 ∧ -p_519) -> ( b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0)
c  in CNF:
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨  b^{173, 4}_2
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨  b^{173, 4}_1
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨  p_519 ∨ -b^{173, 4}_0
c  in DIMACS:
-21398  21399 -21400  519  21401 0
-21398  21399 -21400  519  21402 0
-21398  21399 -21400  519 -21403 0

c  -2-1 --> break 
c    ( b^{173, 3}_2 ∧  b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧ -p_519) -> break
c  in CNF:
c    -b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨  b^{173, 3}_0 ∨  p_519 ∨ break
c  in DIMACS:
-21398 -21399  21400  519 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 3}_2 ∧ -b^{173, 3}_1 ∧ -b^{173, 3}_0 ∧ true) 
c  in CNF:
c    -b^{173, 3}_2 ∨  b^{173, 3}_1 ∨  b^{173, 3}_0 ∨ false 
c  in DIMACS:
-21398  21399  21400  0

c  3 does not represent an automaton state.
c    -(-b^{173, 3}_2 ∧  b^{173, 3}_1 ∧  b^{173, 3}_0 ∧ true) 
c  in CNF:
c     b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ false 
c  in DIMACS:
 21398 -21399 -21400  0
c  -3 does not represent an automaton state.
c    -( b^{173, 3}_2 ∧  b^{173, 3}_1 ∧  b^{173, 3}_0 ∧ true) 
c  in CNF:
c    -b^{173, 3}_2 ∨ -b^{173, 3}_1 ∨ -b^{173, 3}_0 ∨ false 
c  in DIMACS:
-21398 -21399 -21400  0

c i = 4
c  -2+1 --> -1
c    ( b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧  p_692) -> ( b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0)
c  in CNF:
c    -b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨  b^{173, 5}_2
c    -b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_1
c    -b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨  b^{173, 5}_0
c  in DIMACS:
-21401 -21402  21403 -692  21404 0
-21401 -21402  21403 -692 -21405 0
-21401 -21402  21403 -692  21406 0

c  -1+1 --> 0
c    ( b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0 ∧  p_692) -> (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧ -b^{173, 5}_0)
c  in CNF:
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_2
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_1
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_0
c  in DIMACS:
-21401  21402 -21403 -692 -21404 0
-21401  21402 -21403 -692 -21405 0
-21401  21402 -21403 -692 -21406 0

c  0+1 --> 1
c    (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧  p_692) -> (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0)
c  in CNF:
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_2
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_1
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨  b^{173, 5}_0
c  in DIMACS:
 21401  21402  21403 -692 -21404 0
 21401  21402  21403 -692 -21405 0
 21401  21402  21403 -692  21406 0

c  1+1 --> 2
c    (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0 ∧  p_692) -> (-b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0)
c  in CNF:
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_2
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨  b^{173, 5}_1
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ -p_692 ∨ -b^{173, 5}_0
c  in DIMACS:
 21401  21402 -21403 -692 -21404 0
 21401  21402 -21403 -692  21405 0
 21401  21402 -21403 -692 -21406 0

c  2+1 --> break 
c    (-b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧  p_692) -> break
c  in CNF:
c     b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ -p_692 ∨ break
c  in DIMACS:
 21401 -21402  21403 -692 1162 0


c  2-1 --> 1
c    (-b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧ -p_692) -> (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0)
c  in CNF:
c     b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_2
c     b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_1
c     b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨  b^{173, 5}_0
c  in DIMACS:
 21401 -21402  21403  692 -21404 0
 21401 -21402  21403  692 -21405 0
 21401 -21402  21403  692  21406 0

c  1-1 --> 0
c    (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0 ∧ -p_692) -> (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧ -b^{173, 5}_0)
c  in CNF:
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_2
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_1
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_0
c  in DIMACS:
 21401  21402 -21403  692 -21404 0
 21401  21402 -21403  692 -21405 0
 21401  21402 -21403  692 -21406 0

c  0-1 --> -1
c    (-b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧ -p_692) -> ( b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0)
c  in CNF:
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨  b^{173, 5}_2
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_1
c     b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨  b^{173, 5}_0
c  in DIMACS:
 21401  21402  21403  692  21404 0
 21401  21402  21403  692 -21405 0
 21401  21402  21403  692  21406 0

c  -1-1 --> -2
c    ( b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧  b^{173, 4}_0 ∧ -p_692) -> ( b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0)
c  in CNF:
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨  b^{173, 5}_2
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨  b^{173, 5}_1
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨  p_692 ∨ -b^{173, 5}_0
c  in DIMACS:
-21401  21402 -21403  692  21404 0
-21401  21402 -21403  692  21405 0
-21401  21402 -21403  692 -21406 0

c  -2-1 --> break 
c    ( b^{173, 4}_2 ∧  b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧ -p_692) -> break
c  in CNF:
c    -b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨  b^{173, 4}_0 ∨  p_692 ∨ break
c  in DIMACS:
-21401 -21402  21403  692 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 4}_2 ∧ -b^{173, 4}_1 ∧ -b^{173, 4}_0 ∧ true) 
c  in CNF:
c    -b^{173, 4}_2 ∨  b^{173, 4}_1 ∨  b^{173, 4}_0 ∨ false 
c  in DIMACS:
-21401  21402  21403  0

c  3 does not represent an automaton state.
c    -(-b^{173, 4}_2 ∧  b^{173, 4}_1 ∧  b^{173, 4}_0 ∧ true) 
c  in CNF:
c     b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ false 
c  in DIMACS:
 21401 -21402 -21403  0
c  -3 does not represent an automaton state.
c    -( b^{173, 4}_2 ∧  b^{173, 4}_1 ∧  b^{173, 4}_0 ∧ true) 
c  in CNF:
c    -b^{173, 4}_2 ∨ -b^{173, 4}_1 ∨ -b^{173, 4}_0 ∨ false 
c  in DIMACS:
-21401 -21402 -21403  0

c i = 5
c  -2+1 --> -1
c    ( b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧  p_865) -> ( b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0)
c  in CNF:
c    -b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨  b^{173, 6}_2
c    -b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_1
c    -b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨  b^{173, 6}_0
c  in DIMACS:
-21404 -21405  21406 -865  21407 0
-21404 -21405  21406 -865 -21408 0
-21404 -21405  21406 -865  21409 0

c  -1+1 --> 0
c    ( b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0 ∧  p_865) -> (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧ -b^{173, 6}_0)
c  in CNF:
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_2
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_1
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_0
c  in DIMACS:
-21404  21405 -21406 -865 -21407 0
-21404  21405 -21406 -865 -21408 0
-21404  21405 -21406 -865 -21409 0

c  0+1 --> 1
c    (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧  p_865) -> (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0)
c  in CNF:
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_2
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_1
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨  b^{173, 6}_0
c  in DIMACS:
 21404  21405  21406 -865 -21407 0
 21404  21405  21406 -865 -21408 0
 21404  21405  21406 -865  21409 0

c  1+1 --> 2
c    (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0 ∧  p_865) -> (-b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0)
c  in CNF:
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_2
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨  b^{173, 6}_1
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ -p_865 ∨ -b^{173, 6}_0
c  in DIMACS:
 21404  21405 -21406 -865 -21407 0
 21404  21405 -21406 -865  21408 0
 21404  21405 -21406 -865 -21409 0

c  2+1 --> break 
c    (-b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧  p_865) -> break
c  in CNF:
c     b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ -p_865 ∨ break
c  in DIMACS:
 21404 -21405  21406 -865 1162 0


c  2-1 --> 1
c    (-b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧ -p_865) -> (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0)
c  in CNF:
c     b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_2
c     b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_1
c     b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨  b^{173, 6}_0
c  in DIMACS:
 21404 -21405  21406  865 -21407 0
 21404 -21405  21406  865 -21408 0
 21404 -21405  21406  865  21409 0

c  1-1 --> 0
c    (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0 ∧ -p_865) -> (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧ -b^{173, 6}_0)
c  in CNF:
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_2
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_1
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_0
c  in DIMACS:
 21404  21405 -21406  865 -21407 0
 21404  21405 -21406  865 -21408 0
 21404  21405 -21406  865 -21409 0

c  0-1 --> -1
c    (-b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧ -p_865) -> ( b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0)
c  in CNF:
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨  b^{173, 6}_2
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_1
c     b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨  b^{173, 6}_0
c  in DIMACS:
 21404  21405  21406  865  21407 0
 21404  21405  21406  865 -21408 0
 21404  21405  21406  865  21409 0

c  -1-1 --> -2
c    ( b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧  b^{173, 5}_0 ∧ -p_865) -> ( b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0)
c  in CNF:
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨  b^{173, 6}_2
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨  b^{173, 6}_1
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨  p_865 ∨ -b^{173, 6}_0
c  in DIMACS:
-21404  21405 -21406  865  21407 0
-21404  21405 -21406  865  21408 0
-21404  21405 -21406  865 -21409 0

c  -2-1 --> break 
c    ( b^{173, 5}_2 ∧  b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧ -p_865) -> break
c  in CNF:
c    -b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨  b^{173, 5}_0 ∨  p_865 ∨ break
c  in DIMACS:
-21404 -21405  21406  865 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 5}_2 ∧ -b^{173, 5}_1 ∧ -b^{173, 5}_0 ∧ true) 
c  in CNF:
c    -b^{173, 5}_2 ∨  b^{173, 5}_1 ∨  b^{173, 5}_0 ∨ false 
c  in DIMACS:
-21404  21405  21406  0

c  3 does not represent an automaton state.
c    -(-b^{173, 5}_2 ∧  b^{173, 5}_1 ∧  b^{173, 5}_0 ∧ true) 
c  in CNF:
c     b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ false 
c  in DIMACS:
 21404 -21405 -21406  0
c  -3 does not represent an automaton state.
c    -( b^{173, 5}_2 ∧  b^{173, 5}_1 ∧  b^{173, 5}_0 ∧ true) 
c  in CNF:
c    -b^{173, 5}_2 ∨ -b^{173, 5}_1 ∨ -b^{173, 5}_0 ∨ false 
c  in DIMACS:
-21404 -21405 -21406  0

c i = 6
c  -2+1 --> -1
c    ( b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧  p_1038) -> ( b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧  b^{173, 7}_0)
c  in CNF:
c    -b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨  b^{173, 7}_2
c    -b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_1
c    -b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨  b^{173, 7}_0
c  in DIMACS:
-21407 -21408  21409 -1038  21410 0
-21407 -21408  21409 -1038 -21411 0
-21407 -21408  21409 -1038  21412 0

c  -1+1 --> 0
c    ( b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0 ∧  p_1038) -> (-b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧ -b^{173, 7}_0)
c  in CNF:
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_2
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_1
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_0
c  in DIMACS:
-21407  21408 -21409 -1038 -21410 0
-21407  21408 -21409 -1038 -21411 0
-21407  21408 -21409 -1038 -21412 0

c  0+1 --> 1
c    (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧  p_1038) -> (-b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧  b^{173, 7}_0)
c  in CNF:
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_2
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_1
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨  b^{173, 7}_0
c  in DIMACS:
 21407  21408  21409 -1038 -21410 0
 21407  21408  21409 -1038 -21411 0
 21407  21408  21409 -1038  21412 0

c  1+1 --> 2
c    (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0 ∧  p_1038) -> (-b^{173, 7}_2 ∧  b^{173, 7}_1 ∧ -b^{173, 7}_0)
c  in CNF:
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_2
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨  b^{173, 7}_1
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ -p_1038 ∨ -b^{173, 7}_0
c  in DIMACS:
 21407  21408 -21409 -1038 -21410 0
 21407  21408 -21409 -1038  21411 0
 21407  21408 -21409 -1038 -21412 0

c  2+1 --> break 
c    (-b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 21407 -21408  21409 -1038 1162 0


c  2-1 --> 1
c    (-b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧ -p_1038) -> (-b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧  b^{173, 7}_0)
c  in CNF:
c     b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_2
c     b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_1
c     b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨  b^{173, 7}_0
c  in DIMACS:
 21407 -21408  21409  1038 -21410 0
 21407 -21408  21409  1038 -21411 0
 21407 -21408  21409  1038  21412 0

c  1-1 --> 0
c    (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0 ∧ -p_1038) -> (-b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧ -b^{173, 7}_0)
c  in CNF:
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_2
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_1
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_0
c  in DIMACS:
 21407  21408 -21409  1038 -21410 0
 21407  21408 -21409  1038 -21411 0
 21407  21408 -21409  1038 -21412 0

c  0-1 --> -1
c    (-b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧ -p_1038) -> ( b^{173, 7}_2 ∧ -b^{173, 7}_1 ∧  b^{173, 7}_0)
c  in CNF:
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨  b^{173, 7}_2
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_1
c     b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨  b^{173, 7}_0
c  in DIMACS:
 21407  21408  21409  1038  21410 0
 21407  21408  21409  1038 -21411 0
 21407  21408  21409  1038  21412 0

c  -1-1 --> -2
c    ( b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧  b^{173, 6}_0 ∧ -p_1038) -> ( b^{173, 7}_2 ∧  b^{173, 7}_1 ∧ -b^{173, 7}_0)
c  in CNF:
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨  b^{173, 7}_2
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨  b^{173, 7}_1
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨  p_1038 ∨ -b^{173, 7}_0
c  in DIMACS:
-21407  21408 -21409  1038  21410 0
-21407  21408 -21409  1038  21411 0
-21407  21408 -21409  1038 -21412 0

c  -2-1 --> break 
c    ( b^{173, 6}_2 ∧  b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨  b^{173, 6}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-21407 -21408  21409  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{173, 6}_2 ∧ -b^{173, 6}_1 ∧ -b^{173, 6}_0 ∧ true) 
c  in CNF:
c    -b^{173, 6}_2 ∨  b^{173, 6}_1 ∨  b^{173, 6}_0 ∨ false 
c  in DIMACS:
-21407  21408  21409  0

c  3 does not represent an automaton state.
c    -(-b^{173, 6}_2 ∧  b^{173, 6}_1 ∧  b^{173, 6}_0 ∧ true) 
c  in CNF:
c     b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ false 
c  in DIMACS:
 21407 -21408 -21409  0
c  -3 does not represent an automaton state.
c    -( b^{173, 6}_2 ∧  b^{173, 6}_1 ∧  b^{173, 6}_0 ∧ true) 
c  in CNF:
c    -b^{173, 6}_2 ∨ -b^{173, 6}_1 ∨ -b^{173, 6}_0 ∨ false 
c  in DIMACS:
-21407 -21408 -21409  0

c INIT for k = 174
c    -b^{174, 1}_2
c    -b^{174, 1}_1
c    -b^{174, 1}_0
c  in DIMACS:
-21413 0
-21414 0
-21415 0

c Transitions for k = 174
c i = 1
c  -2+1 --> -1
c    ( b^{174, 1}_2 ∧  b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧  p_174) -> ( b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0)
c  in CNF:
c    -b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨  b^{174, 2}_2
c    -b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_1
c    -b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨  b^{174, 2}_0
c  in DIMACS:
-21413 -21414  21415 -174  21416 0
-21413 -21414  21415 -174 -21417 0
-21413 -21414  21415 -174  21418 0

c  -1+1 --> 0
c    ( b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧  b^{174, 1}_0 ∧  p_174) -> (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧ -b^{174, 2}_0)
c  in CNF:
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_2
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_1
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_0
c  in DIMACS:
-21413  21414 -21415 -174 -21416 0
-21413  21414 -21415 -174 -21417 0
-21413  21414 -21415 -174 -21418 0

c  0+1 --> 1
c    (-b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧  p_174) -> (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0)
c  in CNF:
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_2
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_1
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨  b^{174, 2}_0
c  in DIMACS:
 21413  21414  21415 -174 -21416 0
 21413  21414  21415 -174 -21417 0
 21413  21414  21415 -174  21418 0

c  1+1 --> 2
c    (-b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧  b^{174, 1}_0 ∧  p_174) -> (-b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0)
c  in CNF:
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_2
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨  b^{174, 2}_1
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ -p_174 ∨ -b^{174, 2}_0
c  in DIMACS:
 21413  21414 -21415 -174 -21416 0
 21413  21414 -21415 -174  21417 0
 21413  21414 -21415 -174 -21418 0

c  2+1 --> break 
c    (-b^{174, 1}_2 ∧  b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧  p_174) -> break
c  in CNF:
c     b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ -p_174 ∨ break
c  in DIMACS:
 21413 -21414  21415 -174 1162 0


c  2-1 --> 1
c    (-b^{174, 1}_2 ∧  b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧ -p_174) -> (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0)
c  in CNF:
c     b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_2
c     b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_1
c     b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨  b^{174, 2}_0
c  in DIMACS:
 21413 -21414  21415  174 -21416 0
 21413 -21414  21415  174 -21417 0
 21413 -21414  21415  174  21418 0

c  1-1 --> 0
c    (-b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧  b^{174, 1}_0 ∧ -p_174) -> (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧ -b^{174, 2}_0)
c  in CNF:
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_2
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_1
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_0
c  in DIMACS:
 21413  21414 -21415  174 -21416 0
 21413  21414 -21415  174 -21417 0
 21413  21414 -21415  174 -21418 0

c  0-1 --> -1
c    (-b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧ -p_174) -> ( b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0)
c  in CNF:
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨  b^{174, 2}_2
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_1
c     b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨  b^{174, 2}_0
c  in DIMACS:
 21413  21414  21415  174  21416 0
 21413  21414  21415  174 -21417 0
 21413  21414  21415  174  21418 0

c  -1-1 --> -2
c    ( b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧  b^{174, 1}_0 ∧ -p_174) -> ( b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0)
c  in CNF:
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨  b^{174, 2}_2
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨  b^{174, 2}_1
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨  p_174 ∨ -b^{174, 2}_0
c  in DIMACS:
-21413  21414 -21415  174  21416 0
-21413  21414 -21415  174  21417 0
-21413  21414 -21415  174 -21418 0

c  -2-1 --> break 
c    ( b^{174, 1}_2 ∧  b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧ -p_174) -> break
c  in CNF:
c    -b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨  b^{174, 1}_0 ∨  p_174 ∨ break
c  in DIMACS:
-21413 -21414  21415  174 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 1}_2 ∧ -b^{174, 1}_1 ∧ -b^{174, 1}_0 ∧ true) 
c  in CNF:
c    -b^{174, 1}_2 ∨  b^{174, 1}_1 ∨  b^{174, 1}_0 ∨ false 
c  in DIMACS:
-21413  21414  21415  0

c  3 does not represent an automaton state.
c    -(-b^{174, 1}_2 ∧  b^{174, 1}_1 ∧  b^{174, 1}_0 ∧ true) 
c  in CNF:
c     b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ false 
c  in DIMACS:
 21413 -21414 -21415  0
c  -3 does not represent an automaton state.
c    -( b^{174, 1}_2 ∧  b^{174, 1}_1 ∧  b^{174, 1}_0 ∧ true) 
c  in CNF:
c    -b^{174, 1}_2 ∨ -b^{174, 1}_1 ∨ -b^{174, 1}_0 ∨ false 
c  in DIMACS:
-21413 -21414 -21415  0

c i = 2
c  -2+1 --> -1
c    ( b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧  p_348) -> ( b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0)
c  in CNF:
c    -b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨  b^{174, 3}_2
c    -b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_1
c    -b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨  b^{174, 3}_0
c  in DIMACS:
-21416 -21417  21418 -348  21419 0
-21416 -21417  21418 -348 -21420 0
-21416 -21417  21418 -348  21421 0

c  -1+1 --> 0
c    ( b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0 ∧  p_348) -> (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧ -b^{174, 3}_0)
c  in CNF:
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_2
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_1
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_0
c  in DIMACS:
-21416  21417 -21418 -348 -21419 0
-21416  21417 -21418 -348 -21420 0
-21416  21417 -21418 -348 -21421 0

c  0+1 --> 1
c    (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧  p_348) -> (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0)
c  in CNF:
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_2
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_1
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨  b^{174, 3}_0
c  in DIMACS:
 21416  21417  21418 -348 -21419 0
 21416  21417  21418 -348 -21420 0
 21416  21417  21418 -348  21421 0

c  1+1 --> 2
c    (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0 ∧  p_348) -> (-b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0)
c  in CNF:
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_2
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨  b^{174, 3}_1
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ -p_348 ∨ -b^{174, 3}_0
c  in DIMACS:
 21416  21417 -21418 -348 -21419 0
 21416  21417 -21418 -348  21420 0
 21416  21417 -21418 -348 -21421 0

c  2+1 --> break 
c    (-b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧  p_348) -> break
c  in CNF:
c     b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 21416 -21417  21418 -348 1162 0


c  2-1 --> 1
c    (-b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧ -p_348) -> (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0)
c  in CNF:
c     b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_2
c     b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_1
c     b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨  b^{174, 3}_0
c  in DIMACS:
 21416 -21417  21418  348 -21419 0
 21416 -21417  21418  348 -21420 0
 21416 -21417  21418  348  21421 0

c  1-1 --> 0
c    (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0 ∧ -p_348) -> (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧ -b^{174, 3}_0)
c  in CNF:
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_2
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_1
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_0
c  in DIMACS:
 21416  21417 -21418  348 -21419 0
 21416  21417 -21418  348 -21420 0
 21416  21417 -21418  348 -21421 0

c  0-1 --> -1
c    (-b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧ -p_348) -> ( b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0)
c  in CNF:
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨  b^{174, 3}_2
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_1
c     b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨  b^{174, 3}_0
c  in DIMACS:
 21416  21417  21418  348  21419 0
 21416  21417  21418  348 -21420 0
 21416  21417  21418  348  21421 0

c  -1-1 --> -2
c    ( b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧  b^{174, 2}_0 ∧ -p_348) -> ( b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0)
c  in CNF:
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨  b^{174, 3}_2
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨  b^{174, 3}_1
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨  p_348 ∨ -b^{174, 3}_0
c  in DIMACS:
-21416  21417 -21418  348  21419 0
-21416  21417 -21418  348  21420 0
-21416  21417 -21418  348 -21421 0

c  -2-1 --> break 
c    ( b^{174, 2}_2 ∧  b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨  b^{174, 2}_0 ∨  p_348 ∨ break
c  in DIMACS:
-21416 -21417  21418  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 2}_2 ∧ -b^{174, 2}_1 ∧ -b^{174, 2}_0 ∧ true) 
c  in CNF:
c    -b^{174, 2}_2 ∨  b^{174, 2}_1 ∨  b^{174, 2}_0 ∨ false 
c  in DIMACS:
-21416  21417  21418  0

c  3 does not represent an automaton state.
c    -(-b^{174, 2}_2 ∧  b^{174, 2}_1 ∧  b^{174, 2}_0 ∧ true) 
c  in CNF:
c     b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ false 
c  in DIMACS:
 21416 -21417 -21418  0
c  -3 does not represent an automaton state.
c    -( b^{174, 2}_2 ∧  b^{174, 2}_1 ∧  b^{174, 2}_0 ∧ true) 
c  in CNF:
c    -b^{174, 2}_2 ∨ -b^{174, 2}_1 ∨ -b^{174, 2}_0 ∨ false 
c  in DIMACS:
-21416 -21417 -21418  0

c i = 3
c  -2+1 --> -1
c    ( b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧  p_522) -> ( b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0)
c  in CNF:
c    -b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨  b^{174, 4}_2
c    -b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_1
c    -b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨  b^{174, 4}_0
c  in DIMACS:
-21419 -21420  21421 -522  21422 0
-21419 -21420  21421 -522 -21423 0
-21419 -21420  21421 -522  21424 0

c  -1+1 --> 0
c    ( b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0 ∧  p_522) -> (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧ -b^{174, 4}_0)
c  in CNF:
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_2
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_1
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_0
c  in DIMACS:
-21419  21420 -21421 -522 -21422 0
-21419  21420 -21421 -522 -21423 0
-21419  21420 -21421 -522 -21424 0

c  0+1 --> 1
c    (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧  p_522) -> (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0)
c  in CNF:
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_2
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_1
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨  b^{174, 4}_0
c  in DIMACS:
 21419  21420  21421 -522 -21422 0
 21419  21420  21421 -522 -21423 0
 21419  21420  21421 -522  21424 0

c  1+1 --> 2
c    (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0 ∧  p_522) -> (-b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0)
c  in CNF:
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_2
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨  b^{174, 4}_1
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ -p_522 ∨ -b^{174, 4}_0
c  in DIMACS:
 21419  21420 -21421 -522 -21422 0
 21419  21420 -21421 -522  21423 0
 21419  21420 -21421 -522 -21424 0

c  2+1 --> break 
c    (-b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧  p_522) -> break
c  in CNF:
c     b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 21419 -21420  21421 -522 1162 0


c  2-1 --> 1
c    (-b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧ -p_522) -> (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0)
c  in CNF:
c     b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_2
c     b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_1
c     b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨  b^{174, 4}_0
c  in DIMACS:
 21419 -21420  21421  522 -21422 0
 21419 -21420  21421  522 -21423 0
 21419 -21420  21421  522  21424 0

c  1-1 --> 0
c    (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0 ∧ -p_522) -> (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧ -b^{174, 4}_0)
c  in CNF:
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_2
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_1
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_0
c  in DIMACS:
 21419  21420 -21421  522 -21422 0
 21419  21420 -21421  522 -21423 0
 21419  21420 -21421  522 -21424 0

c  0-1 --> -1
c    (-b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧ -p_522) -> ( b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0)
c  in CNF:
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨  b^{174, 4}_2
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_1
c     b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨  b^{174, 4}_0
c  in DIMACS:
 21419  21420  21421  522  21422 0
 21419  21420  21421  522 -21423 0
 21419  21420  21421  522  21424 0

c  -1-1 --> -2
c    ( b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧  b^{174, 3}_0 ∧ -p_522) -> ( b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0)
c  in CNF:
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨  b^{174, 4}_2
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨  b^{174, 4}_1
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨  p_522 ∨ -b^{174, 4}_0
c  in DIMACS:
-21419  21420 -21421  522  21422 0
-21419  21420 -21421  522  21423 0
-21419  21420 -21421  522 -21424 0

c  -2-1 --> break 
c    ( b^{174, 3}_2 ∧  b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨  b^{174, 3}_0 ∨  p_522 ∨ break
c  in DIMACS:
-21419 -21420  21421  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 3}_2 ∧ -b^{174, 3}_1 ∧ -b^{174, 3}_0 ∧ true) 
c  in CNF:
c    -b^{174, 3}_2 ∨  b^{174, 3}_1 ∨  b^{174, 3}_0 ∨ false 
c  in DIMACS:
-21419  21420  21421  0

c  3 does not represent an automaton state.
c    -(-b^{174, 3}_2 ∧  b^{174, 3}_1 ∧  b^{174, 3}_0 ∧ true) 
c  in CNF:
c     b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ false 
c  in DIMACS:
 21419 -21420 -21421  0
c  -3 does not represent an automaton state.
c    -( b^{174, 3}_2 ∧  b^{174, 3}_1 ∧  b^{174, 3}_0 ∧ true) 
c  in CNF:
c    -b^{174, 3}_2 ∨ -b^{174, 3}_1 ∨ -b^{174, 3}_0 ∨ false 
c  in DIMACS:
-21419 -21420 -21421  0

c i = 4
c  -2+1 --> -1
c    ( b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧  p_696) -> ( b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0)
c  in CNF:
c    -b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨  b^{174, 5}_2
c    -b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_1
c    -b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨  b^{174, 5}_0
c  in DIMACS:
-21422 -21423  21424 -696  21425 0
-21422 -21423  21424 -696 -21426 0
-21422 -21423  21424 -696  21427 0

c  -1+1 --> 0
c    ( b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0 ∧  p_696) -> (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧ -b^{174, 5}_0)
c  in CNF:
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_2
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_1
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_0
c  in DIMACS:
-21422  21423 -21424 -696 -21425 0
-21422  21423 -21424 -696 -21426 0
-21422  21423 -21424 -696 -21427 0

c  0+1 --> 1
c    (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧  p_696) -> (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0)
c  in CNF:
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_2
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_1
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨  b^{174, 5}_0
c  in DIMACS:
 21422  21423  21424 -696 -21425 0
 21422  21423  21424 -696 -21426 0
 21422  21423  21424 -696  21427 0

c  1+1 --> 2
c    (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0 ∧  p_696) -> (-b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0)
c  in CNF:
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_2
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨  b^{174, 5}_1
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ -p_696 ∨ -b^{174, 5}_0
c  in DIMACS:
 21422  21423 -21424 -696 -21425 0
 21422  21423 -21424 -696  21426 0
 21422  21423 -21424 -696 -21427 0

c  2+1 --> break 
c    (-b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧  p_696) -> break
c  in CNF:
c     b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 21422 -21423  21424 -696 1162 0


c  2-1 --> 1
c    (-b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧ -p_696) -> (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0)
c  in CNF:
c     b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_2
c     b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_1
c     b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨  b^{174, 5}_0
c  in DIMACS:
 21422 -21423  21424  696 -21425 0
 21422 -21423  21424  696 -21426 0
 21422 -21423  21424  696  21427 0

c  1-1 --> 0
c    (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0 ∧ -p_696) -> (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧ -b^{174, 5}_0)
c  in CNF:
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_2
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_1
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_0
c  in DIMACS:
 21422  21423 -21424  696 -21425 0
 21422  21423 -21424  696 -21426 0
 21422  21423 -21424  696 -21427 0

c  0-1 --> -1
c    (-b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧ -p_696) -> ( b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0)
c  in CNF:
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨  b^{174, 5}_2
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_1
c     b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨  b^{174, 5}_0
c  in DIMACS:
 21422  21423  21424  696  21425 0
 21422  21423  21424  696 -21426 0
 21422  21423  21424  696  21427 0

c  -1-1 --> -2
c    ( b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧  b^{174, 4}_0 ∧ -p_696) -> ( b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0)
c  in CNF:
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨  b^{174, 5}_2
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨  b^{174, 5}_1
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨  p_696 ∨ -b^{174, 5}_0
c  in DIMACS:
-21422  21423 -21424  696  21425 0
-21422  21423 -21424  696  21426 0
-21422  21423 -21424  696 -21427 0

c  -2-1 --> break 
c    ( b^{174, 4}_2 ∧  b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨  b^{174, 4}_0 ∨  p_696 ∨ break
c  in DIMACS:
-21422 -21423  21424  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 4}_2 ∧ -b^{174, 4}_1 ∧ -b^{174, 4}_0 ∧ true) 
c  in CNF:
c    -b^{174, 4}_2 ∨  b^{174, 4}_1 ∨  b^{174, 4}_0 ∨ false 
c  in DIMACS:
-21422  21423  21424  0

c  3 does not represent an automaton state.
c    -(-b^{174, 4}_2 ∧  b^{174, 4}_1 ∧  b^{174, 4}_0 ∧ true) 
c  in CNF:
c     b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ false 
c  in DIMACS:
 21422 -21423 -21424  0
c  -3 does not represent an automaton state.
c    -( b^{174, 4}_2 ∧  b^{174, 4}_1 ∧  b^{174, 4}_0 ∧ true) 
c  in CNF:
c    -b^{174, 4}_2 ∨ -b^{174, 4}_1 ∨ -b^{174, 4}_0 ∨ false 
c  in DIMACS:
-21422 -21423 -21424  0

c i = 5
c  -2+1 --> -1
c    ( b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧  p_870) -> ( b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0)
c  in CNF:
c    -b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨  b^{174, 6}_2
c    -b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_1
c    -b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨  b^{174, 6}_0
c  in DIMACS:
-21425 -21426  21427 -870  21428 0
-21425 -21426  21427 -870 -21429 0
-21425 -21426  21427 -870  21430 0

c  -1+1 --> 0
c    ( b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0 ∧  p_870) -> (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧ -b^{174, 6}_0)
c  in CNF:
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_2
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_1
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_0
c  in DIMACS:
-21425  21426 -21427 -870 -21428 0
-21425  21426 -21427 -870 -21429 0
-21425  21426 -21427 -870 -21430 0

c  0+1 --> 1
c    (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧  p_870) -> (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0)
c  in CNF:
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_2
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_1
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨  b^{174, 6}_0
c  in DIMACS:
 21425  21426  21427 -870 -21428 0
 21425  21426  21427 -870 -21429 0
 21425  21426  21427 -870  21430 0

c  1+1 --> 2
c    (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0 ∧  p_870) -> (-b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0)
c  in CNF:
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_2
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨  b^{174, 6}_1
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ -p_870 ∨ -b^{174, 6}_0
c  in DIMACS:
 21425  21426 -21427 -870 -21428 0
 21425  21426 -21427 -870  21429 0
 21425  21426 -21427 -870 -21430 0

c  2+1 --> break 
c    (-b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧  p_870) -> break
c  in CNF:
c     b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 21425 -21426  21427 -870 1162 0


c  2-1 --> 1
c    (-b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧ -p_870) -> (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0)
c  in CNF:
c     b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_2
c     b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_1
c     b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨  b^{174, 6}_0
c  in DIMACS:
 21425 -21426  21427  870 -21428 0
 21425 -21426  21427  870 -21429 0
 21425 -21426  21427  870  21430 0

c  1-1 --> 0
c    (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0 ∧ -p_870) -> (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧ -b^{174, 6}_0)
c  in CNF:
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_2
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_1
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_0
c  in DIMACS:
 21425  21426 -21427  870 -21428 0
 21425  21426 -21427  870 -21429 0
 21425  21426 -21427  870 -21430 0

c  0-1 --> -1
c    (-b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧ -p_870) -> ( b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0)
c  in CNF:
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨  b^{174, 6}_2
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_1
c     b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨  b^{174, 6}_0
c  in DIMACS:
 21425  21426  21427  870  21428 0
 21425  21426  21427  870 -21429 0
 21425  21426  21427  870  21430 0

c  -1-1 --> -2
c    ( b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧  b^{174, 5}_0 ∧ -p_870) -> ( b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0)
c  in CNF:
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨  b^{174, 6}_2
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨  b^{174, 6}_1
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨  p_870 ∨ -b^{174, 6}_0
c  in DIMACS:
-21425  21426 -21427  870  21428 0
-21425  21426 -21427  870  21429 0
-21425  21426 -21427  870 -21430 0

c  -2-1 --> break 
c    ( b^{174, 5}_2 ∧  b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨  b^{174, 5}_0 ∨  p_870 ∨ break
c  in DIMACS:
-21425 -21426  21427  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 5}_2 ∧ -b^{174, 5}_1 ∧ -b^{174, 5}_0 ∧ true) 
c  in CNF:
c    -b^{174, 5}_2 ∨  b^{174, 5}_1 ∨  b^{174, 5}_0 ∨ false 
c  in DIMACS:
-21425  21426  21427  0

c  3 does not represent an automaton state.
c    -(-b^{174, 5}_2 ∧  b^{174, 5}_1 ∧  b^{174, 5}_0 ∧ true) 
c  in CNF:
c     b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ false 
c  in DIMACS:
 21425 -21426 -21427  0
c  -3 does not represent an automaton state.
c    -( b^{174, 5}_2 ∧  b^{174, 5}_1 ∧  b^{174, 5}_0 ∧ true) 
c  in CNF:
c    -b^{174, 5}_2 ∨ -b^{174, 5}_1 ∨ -b^{174, 5}_0 ∨ false 
c  in DIMACS:
-21425 -21426 -21427  0

c i = 6
c  -2+1 --> -1
c    ( b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧  p_1044) -> ( b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧  b^{174, 7}_0)
c  in CNF:
c    -b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨  b^{174, 7}_2
c    -b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_1
c    -b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨  b^{174, 7}_0
c  in DIMACS:
-21428 -21429  21430 -1044  21431 0
-21428 -21429  21430 -1044 -21432 0
-21428 -21429  21430 -1044  21433 0

c  -1+1 --> 0
c    ( b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0 ∧  p_1044) -> (-b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧ -b^{174, 7}_0)
c  in CNF:
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_2
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_1
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_0
c  in DIMACS:
-21428  21429 -21430 -1044 -21431 0
-21428  21429 -21430 -1044 -21432 0
-21428  21429 -21430 -1044 -21433 0

c  0+1 --> 1
c    (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧  p_1044) -> (-b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧  b^{174, 7}_0)
c  in CNF:
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_2
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_1
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨  b^{174, 7}_0
c  in DIMACS:
 21428  21429  21430 -1044 -21431 0
 21428  21429  21430 -1044 -21432 0
 21428  21429  21430 -1044  21433 0

c  1+1 --> 2
c    (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0 ∧  p_1044) -> (-b^{174, 7}_2 ∧  b^{174, 7}_1 ∧ -b^{174, 7}_0)
c  in CNF:
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_2
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨  b^{174, 7}_1
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ -p_1044 ∨ -b^{174, 7}_0
c  in DIMACS:
 21428  21429 -21430 -1044 -21431 0
 21428  21429 -21430 -1044  21432 0
 21428  21429 -21430 -1044 -21433 0

c  2+1 --> break 
c    (-b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 21428 -21429  21430 -1044 1162 0


c  2-1 --> 1
c    (-b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧ -p_1044) -> (-b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧  b^{174, 7}_0)
c  in CNF:
c     b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_2
c     b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_1
c     b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨  b^{174, 7}_0
c  in DIMACS:
 21428 -21429  21430  1044 -21431 0
 21428 -21429  21430  1044 -21432 0
 21428 -21429  21430  1044  21433 0

c  1-1 --> 0
c    (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0 ∧ -p_1044) -> (-b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧ -b^{174, 7}_0)
c  in CNF:
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_2
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_1
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_0
c  in DIMACS:
 21428  21429 -21430  1044 -21431 0
 21428  21429 -21430  1044 -21432 0
 21428  21429 -21430  1044 -21433 0

c  0-1 --> -1
c    (-b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧ -p_1044) -> ( b^{174, 7}_2 ∧ -b^{174, 7}_1 ∧  b^{174, 7}_0)
c  in CNF:
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨  b^{174, 7}_2
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_1
c     b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨  b^{174, 7}_0
c  in DIMACS:
 21428  21429  21430  1044  21431 0
 21428  21429  21430  1044 -21432 0
 21428  21429  21430  1044  21433 0

c  -1-1 --> -2
c    ( b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧  b^{174, 6}_0 ∧ -p_1044) -> ( b^{174, 7}_2 ∧  b^{174, 7}_1 ∧ -b^{174, 7}_0)
c  in CNF:
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨  b^{174, 7}_2
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨  b^{174, 7}_1
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨  p_1044 ∨ -b^{174, 7}_0
c  in DIMACS:
-21428  21429 -21430  1044  21431 0
-21428  21429 -21430  1044  21432 0
-21428  21429 -21430  1044 -21433 0

c  -2-1 --> break 
c    ( b^{174, 6}_2 ∧  b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨  b^{174, 6}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-21428 -21429  21430  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{174, 6}_2 ∧ -b^{174, 6}_1 ∧ -b^{174, 6}_0 ∧ true) 
c  in CNF:
c    -b^{174, 6}_2 ∨  b^{174, 6}_1 ∨  b^{174, 6}_0 ∨ false 
c  in DIMACS:
-21428  21429  21430  0

c  3 does not represent an automaton state.
c    -(-b^{174, 6}_2 ∧  b^{174, 6}_1 ∧  b^{174, 6}_0 ∧ true) 
c  in CNF:
c     b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ false 
c  in DIMACS:
 21428 -21429 -21430  0
c  -3 does not represent an automaton state.
c    -( b^{174, 6}_2 ∧  b^{174, 6}_1 ∧  b^{174, 6}_0 ∧ true) 
c  in CNF:
c    -b^{174, 6}_2 ∨ -b^{174, 6}_1 ∨ -b^{174, 6}_0 ∨ false 
c  in DIMACS:
-21428 -21429 -21430  0

c INIT for k = 175
c    -b^{175, 1}_2
c    -b^{175, 1}_1
c    -b^{175, 1}_0
c  in DIMACS:
-21434 0
-21435 0
-21436 0

c Transitions for k = 175
c i = 1
c  -2+1 --> -1
c    ( b^{175, 1}_2 ∧  b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧  p_175) -> ( b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0)
c  in CNF:
c    -b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨  b^{175, 2}_2
c    -b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_1
c    -b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨  b^{175, 2}_0
c  in DIMACS:
-21434 -21435  21436 -175  21437 0
-21434 -21435  21436 -175 -21438 0
-21434 -21435  21436 -175  21439 0

c  -1+1 --> 0
c    ( b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧  b^{175, 1}_0 ∧  p_175) -> (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧ -b^{175, 2}_0)
c  in CNF:
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_2
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_1
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_0
c  in DIMACS:
-21434  21435 -21436 -175 -21437 0
-21434  21435 -21436 -175 -21438 0
-21434  21435 -21436 -175 -21439 0

c  0+1 --> 1
c    (-b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧  p_175) -> (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0)
c  in CNF:
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_2
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_1
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨  b^{175, 2}_0
c  in DIMACS:
 21434  21435  21436 -175 -21437 0
 21434  21435  21436 -175 -21438 0
 21434  21435  21436 -175  21439 0

c  1+1 --> 2
c    (-b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧  b^{175, 1}_0 ∧  p_175) -> (-b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0)
c  in CNF:
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_2
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨  b^{175, 2}_1
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ -p_175 ∨ -b^{175, 2}_0
c  in DIMACS:
 21434  21435 -21436 -175 -21437 0
 21434  21435 -21436 -175  21438 0
 21434  21435 -21436 -175 -21439 0

c  2+1 --> break 
c    (-b^{175, 1}_2 ∧  b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧  p_175) -> break
c  in CNF:
c     b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ -p_175 ∨ break
c  in DIMACS:
 21434 -21435  21436 -175 1162 0


c  2-1 --> 1
c    (-b^{175, 1}_2 ∧  b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧ -p_175) -> (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0)
c  in CNF:
c     b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_2
c     b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_1
c     b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨  b^{175, 2}_0
c  in DIMACS:
 21434 -21435  21436  175 -21437 0
 21434 -21435  21436  175 -21438 0
 21434 -21435  21436  175  21439 0

c  1-1 --> 0
c    (-b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧  b^{175, 1}_0 ∧ -p_175) -> (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧ -b^{175, 2}_0)
c  in CNF:
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_2
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_1
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_0
c  in DIMACS:
 21434  21435 -21436  175 -21437 0
 21434  21435 -21436  175 -21438 0
 21434  21435 -21436  175 -21439 0

c  0-1 --> -1
c    (-b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧ -p_175) -> ( b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0)
c  in CNF:
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨  b^{175, 2}_2
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_1
c     b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨  b^{175, 2}_0
c  in DIMACS:
 21434  21435  21436  175  21437 0
 21434  21435  21436  175 -21438 0
 21434  21435  21436  175  21439 0

c  -1-1 --> -2
c    ( b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧  b^{175, 1}_0 ∧ -p_175) -> ( b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0)
c  in CNF:
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨  b^{175, 2}_2
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨  b^{175, 2}_1
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨  p_175 ∨ -b^{175, 2}_0
c  in DIMACS:
-21434  21435 -21436  175  21437 0
-21434  21435 -21436  175  21438 0
-21434  21435 -21436  175 -21439 0

c  -2-1 --> break 
c    ( b^{175, 1}_2 ∧  b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧ -p_175) -> break
c  in CNF:
c    -b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨  b^{175, 1}_0 ∨  p_175 ∨ break
c  in DIMACS:
-21434 -21435  21436  175 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 1}_2 ∧ -b^{175, 1}_1 ∧ -b^{175, 1}_0 ∧ true) 
c  in CNF:
c    -b^{175, 1}_2 ∨  b^{175, 1}_1 ∨  b^{175, 1}_0 ∨ false 
c  in DIMACS:
-21434  21435  21436  0

c  3 does not represent an automaton state.
c    -(-b^{175, 1}_2 ∧  b^{175, 1}_1 ∧  b^{175, 1}_0 ∧ true) 
c  in CNF:
c     b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ false 
c  in DIMACS:
 21434 -21435 -21436  0
c  -3 does not represent an automaton state.
c    -( b^{175, 1}_2 ∧  b^{175, 1}_1 ∧  b^{175, 1}_0 ∧ true) 
c  in CNF:
c    -b^{175, 1}_2 ∨ -b^{175, 1}_1 ∨ -b^{175, 1}_0 ∨ false 
c  in DIMACS:
-21434 -21435 -21436  0

c i = 2
c  -2+1 --> -1
c    ( b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧  p_350) -> ( b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0)
c  in CNF:
c    -b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨  b^{175, 3}_2
c    -b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_1
c    -b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨  b^{175, 3}_0
c  in DIMACS:
-21437 -21438  21439 -350  21440 0
-21437 -21438  21439 -350 -21441 0
-21437 -21438  21439 -350  21442 0

c  -1+1 --> 0
c    ( b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0 ∧  p_350) -> (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧ -b^{175, 3}_0)
c  in CNF:
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_2
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_1
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_0
c  in DIMACS:
-21437  21438 -21439 -350 -21440 0
-21437  21438 -21439 -350 -21441 0
-21437  21438 -21439 -350 -21442 0

c  0+1 --> 1
c    (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧  p_350) -> (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0)
c  in CNF:
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_2
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_1
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨  b^{175, 3}_0
c  in DIMACS:
 21437  21438  21439 -350 -21440 0
 21437  21438  21439 -350 -21441 0
 21437  21438  21439 -350  21442 0

c  1+1 --> 2
c    (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0 ∧  p_350) -> (-b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0)
c  in CNF:
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_2
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨  b^{175, 3}_1
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ -p_350 ∨ -b^{175, 3}_0
c  in DIMACS:
 21437  21438 -21439 -350 -21440 0
 21437  21438 -21439 -350  21441 0
 21437  21438 -21439 -350 -21442 0

c  2+1 --> break 
c    (-b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧  p_350) -> break
c  in CNF:
c     b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 21437 -21438  21439 -350 1162 0


c  2-1 --> 1
c    (-b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧ -p_350) -> (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0)
c  in CNF:
c     b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_2
c     b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_1
c     b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨  b^{175, 3}_0
c  in DIMACS:
 21437 -21438  21439  350 -21440 0
 21437 -21438  21439  350 -21441 0
 21437 -21438  21439  350  21442 0

c  1-1 --> 0
c    (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0 ∧ -p_350) -> (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧ -b^{175, 3}_0)
c  in CNF:
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_2
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_1
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_0
c  in DIMACS:
 21437  21438 -21439  350 -21440 0
 21437  21438 -21439  350 -21441 0
 21437  21438 -21439  350 -21442 0

c  0-1 --> -1
c    (-b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧ -p_350) -> ( b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0)
c  in CNF:
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨  b^{175, 3}_2
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_1
c     b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨  b^{175, 3}_0
c  in DIMACS:
 21437  21438  21439  350  21440 0
 21437  21438  21439  350 -21441 0
 21437  21438  21439  350  21442 0

c  -1-1 --> -2
c    ( b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧  b^{175, 2}_0 ∧ -p_350) -> ( b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0)
c  in CNF:
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨  b^{175, 3}_2
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨  b^{175, 3}_1
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨  p_350 ∨ -b^{175, 3}_0
c  in DIMACS:
-21437  21438 -21439  350  21440 0
-21437  21438 -21439  350  21441 0
-21437  21438 -21439  350 -21442 0

c  -2-1 --> break 
c    ( b^{175, 2}_2 ∧  b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨  b^{175, 2}_0 ∨  p_350 ∨ break
c  in DIMACS:
-21437 -21438  21439  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 2}_2 ∧ -b^{175, 2}_1 ∧ -b^{175, 2}_0 ∧ true) 
c  in CNF:
c    -b^{175, 2}_2 ∨  b^{175, 2}_1 ∨  b^{175, 2}_0 ∨ false 
c  in DIMACS:
-21437  21438  21439  0

c  3 does not represent an automaton state.
c    -(-b^{175, 2}_2 ∧  b^{175, 2}_1 ∧  b^{175, 2}_0 ∧ true) 
c  in CNF:
c     b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ false 
c  in DIMACS:
 21437 -21438 -21439  0
c  -3 does not represent an automaton state.
c    -( b^{175, 2}_2 ∧  b^{175, 2}_1 ∧  b^{175, 2}_0 ∧ true) 
c  in CNF:
c    -b^{175, 2}_2 ∨ -b^{175, 2}_1 ∨ -b^{175, 2}_0 ∨ false 
c  in DIMACS:
-21437 -21438 -21439  0

c i = 3
c  -2+1 --> -1
c    ( b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧  p_525) -> ( b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0)
c  in CNF:
c    -b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨  b^{175, 4}_2
c    -b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_1
c    -b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨  b^{175, 4}_0
c  in DIMACS:
-21440 -21441  21442 -525  21443 0
-21440 -21441  21442 -525 -21444 0
-21440 -21441  21442 -525  21445 0

c  -1+1 --> 0
c    ( b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0 ∧  p_525) -> (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧ -b^{175, 4}_0)
c  in CNF:
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_2
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_1
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_0
c  in DIMACS:
-21440  21441 -21442 -525 -21443 0
-21440  21441 -21442 -525 -21444 0
-21440  21441 -21442 -525 -21445 0

c  0+1 --> 1
c    (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧  p_525) -> (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0)
c  in CNF:
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_2
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_1
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨  b^{175, 4}_0
c  in DIMACS:
 21440  21441  21442 -525 -21443 0
 21440  21441  21442 -525 -21444 0
 21440  21441  21442 -525  21445 0

c  1+1 --> 2
c    (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0 ∧  p_525) -> (-b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0)
c  in CNF:
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_2
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨  b^{175, 4}_1
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ -p_525 ∨ -b^{175, 4}_0
c  in DIMACS:
 21440  21441 -21442 -525 -21443 0
 21440  21441 -21442 -525  21444 0
 21440  21441 -21442 -525 -21445 0

c  2+1 --> break 
c    (-b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧  p_525) -> break
c  in CNF:
c     b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ -p_525 ∨ break
c  in DIMACS:
 21440 -21441  21442 -525 1162 0


c  2-1 --> 1
c    (-b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧ -p_525) -> (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0)
c  in CNF:
c     b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_2
c     b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_1
c     b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨  b^{175, 4}_0
c  in DIMACS:
 21440 -21441  21442  525 -21443 0
 21440 -21441  21442  525 -21444 0
 21440 -21441  21442  525  21445 0

c  1-1 --> 0
c    (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0 ∧ -p_525) -> (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧ -b^{175, 4}_0)
c  in CNF:
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_2
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_1
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_0
c  in DIMACS:
 21440  21441 -21442  525 -21443 0
 21440  21441 -21442  525 -21444 0
 21440  21441 -21442  525 -21445 0

c  0-1 --> -1
c    (-b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧ -p_525) -> ( b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0)
c  in CNF:
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨  b^{175, 4}_2
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_1
c     b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨  b^{175, 4}_0
c  in DIMACS:
 21440  21441  21442  525  21443 0
 21440  21441  21442  525 -21444 0
 21440  21441  21442  525  21445 0

c  -1-1 --> -2
c    ( b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧  b^{175, 3}_0 ∧ -p_525) -> ( b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0)
c  in CNF:
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨  b^{175, 4}_2
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨  b^{175, 4}_1
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨  p_525 ∨ -b^{175, 4}_0
c  in DIMACS:
-21440  21441 -21442  525  21443 0
-21440  21441 -21442  525  21444 0
-21440  21441 -21442  525 -21445 0

c  -2-1 --> break 
c    ( b^{175, 3}_2 ∧  b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧ -p_525) -> break
c  in CNF:
c    -b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨  b^{175, 3}_0 ∨  p_525 ∨ break
c  in DIMACS:
-21440 -21441  21442  525 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 3}_2 ∧ -b^{175, 3}_1 ∧ -b^{175, 3}_0 ∧ true) 
c  in CNF:
c    -b^{175, 3}_2 ∨  b^{175, 3}_1 ∨  b^{175, 3}_0 ∨ false 
c  in DIMACS:
-21440  21441  21442  0

c  3 does not represent an automaton state.
c    -(-b^{175, 3}_2 ∧  b^{175, 3}_1 ∧  b^{175, 3}_0 ∧ true) 
c  in CNF:
c     b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ false 
c  in DIMACS:
 21440 -21441 -21442  0
c  -3 does not represent an automaton state.
c    -( b^{175, 3}_2 ∧  b^{175, 3}_1 ∧  b^{175, 3}_0 ∧ true) 
c  in CNF:
c    -b^{175, 3}_2 ∨ -b^{175, 3}_1 ∨ -b^{175, 3}_0 ∨ false 
c  in DIMACS:
-21440 -21441 -21442  0

c i = 4
c  -2+1 --> -1
c    ( b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧  p_700) -> ( b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0)
c  in CNF:
c    -b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨  b^{175, 5}_2
c    -b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_1
c    -b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨  b^{175, 5}_0
c  in DIMACS:
-21443 -21444  21445 -700  21446 0
-21443 -21444  21445 -700 -21447 0
-21443 -21444  21445 -700  21448 0

c  -1+1 --> 0
c    ( b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0 ∧  p_700) -> (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧ -b^{175, 5}_0)
c  in CNF:
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_2
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_1
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_0
c  in DIMACS:
-21443  21444 -21445 -700 -21446 0
-21443  21444 -21445 -700 -21447 0
-21443  21444 -21445 -700 -21448 0

c  0+1 --> 1
c    (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧  p_700) -> (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0)
c  in CNF:
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_2
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_1
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨  b^{175, 5}_0
c  in DIMACS:
 21443  21444  21445 -700 -21446 0
 21443  21444  21445 -700 -21447 0
 21443  21444  21445 -700  21448 0

c  1+1 --> 2
c    (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0 ∧  p_700) -> (-b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0)
c  in CNF:
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_2
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨  b^{175, 5}_1
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ -p_700 ∨ -b^{175, 5}_0
c  in DIMACS:
 21443  21444 -21445 -700 -21446 0
 21443  21444 -21445 -700  21447 0
 21443  21444 -21445 -700 -21448 0

c  2+1 --> break 
c    (-b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧  p_700) -> break
c  in CNF:
c     b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 21443 -21444  21445 -700 1162 0


c  2-1 --> 1
c    (-b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧ -p_700) -> (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0)
c  in CNF:
c     b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_2
c     b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_1
c     b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨  b^{175, 5}_0
c  in DIMACS:
 21443 -21444  21445  700 -21446 0
 21443 -21444  21445  700 -21447 0
 21443 -21444  21445  700  21448 0

c  1-1 --> 0
c    (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0 ∧ -p_700) -> (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧ -b^{175, 5}_0)
c  in CNF:
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_2
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_1
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_0
c  in DIMACS:
 21443  21444 -21445  700 -21446 0
 21443  21444 -21445  700 -21447 0
 21443  21444 -21445  700 -21448 0

c  0-1 --> -1
c    (-b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧ -p_700) -> ( b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0)
c  in CNF:
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨  b^{175, 5}_2
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_1
c     b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨  b^{175, 5}_0
c  in DIMACS:
 21443  21444  21445  700  21446 0
 21443  21444  21445  700 -21447 0
 21443  21444  21445  700  21448 0

c  -1-1 --> -2
c    ( b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧  b^{175, 4}_0 ∧ -p_700) -> ( b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0)
c  in CNF:
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨  b^{175, 5}_2
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨  b^{175, 5}_1
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨  p_700 ∨ -b^{175, 5}_0
c  in DIMACS:
-21443  21444 -21445  700  21446 0
-21443  21444 -21445  700  21447 0
-21443  21444 -21445  700 -21448 0

c  -2-1 --> break 
c    ( b^{175, 4}_2 ∧  b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨  b^{175, 4}_0 ∨  p_700 ∨ break
c  in DIMACS:
-21443 -21444  21445  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 4}_2 ∧ -b^{175, 4}_1 ∧ -b^{175, 4}_0 ∧ true) 
c  in CNF:
c    -b^{175, 4}_2 ∨  b^{175, 4}_1 ∨  b^{175, 4}_0 ∨ false 
c  in DIMACS:
-21443  21444  21445  0

c  3 does not represent an automaton state.
c    -(-b^{175, 4}_2 ∧  b^{175, 4}_1 ∧  b^{175, 4}_0 ∧ true) 
c  in CNF:
c     b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ false 
c  in DIMACS:
 21443 -21444 -21445  0
c  -3 does not represent an automaton state.
c    -( b^{175, 4}_2 ∧  b^{175, 4}_1 ∧  b^{175, 4}_0 ∧ true) 
c  in CNF:
c    -b^{175, 4}_2 ∨ -b^{175, 4}_1 ∨ -b^{175, 4}_0 ∨ false 
c  in DIMACS:
-21443 -21444 -21445  0

c i = 5
c  -2+1 --> -1
c    ( b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧  p_875) -> ( b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0)
c  in CNF:
c    -b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨  b^{175, 6}_2
c    -b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_1
c    -b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨  b^{175, 6}_0
c  in DIMACS:
-21446 -21447  21448 -875  21449 0
-21446 -21447  21448 -875 -21450 0
-21446 -21447  21448 -875  21451 0

c  -1+1 --> 0
c    ( b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0 ∧  p_875) -> (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧ -b^{175, 6}_0)
c  in CNF:
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_2
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_1
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_0
c  in DIMACS:
-21446  21447 -21448 -875 -21449 0
-21446  21447 -21448 -875 -21450 0
-21446  21447 -21448 -875 -21451 0

c  0+1 --> 1
c    (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧  p_875) -> (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0)
c  in CNF:
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_2
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_1
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨  b^{175, 6}_0
c  in DIMACS:
 21446  21447  21448 -875 -21449 0
 21446  21447  21448 -875 -21450 0
 21446  21447  21448 -875  21451 0

c  1+1 --> 2
c    (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0 ∧  p_875) -> (-b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0)
c  in CNF:
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_2
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨  b^{175, 6}_1
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ -p_875 ∨ -b^{175, 6}_0
c  in DIMACS:
 21446  21447 -21448 -875 -21449 0
 21446  21447 -21448 -875  21450 0
 21446  21447 -21448 -875 -21451 0

c  2+1 --> break 
c    (-b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧  p_875) -> break
c  in CNF:
c     b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ -p_875 ∨ break
c  in DIMACS:
 21446 -21447  21448 -875 1162 0


c  2-1 --> 1
c    (-b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧ -p_875) -> (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0)
c  in CNF:
c     b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_2
c     b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_1
c     b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨  b^{175, 6}_0
c  in DIMACS:
 21446 -21447  21448  875 -21449 0
 21446 -21447  21448  875 -21450 0
 21446 -21447  21448  875  21451 0

c  1-1 --> 0
c    (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0 ∧ -p_875) -> (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧ -b^{175, 6}_0)
c  in CNF:
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_2
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_1
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_0
c  in DIMACS:
 21446  21447 -21448  875 -21449 0
 21446  21447 -21448  875 -21450 0
 21446  21447 -21448  875 -21451 0

c  0-1 --> -1
c    (-b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧ -p_875) -> ( b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0)
c  in CNF:
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨  b^{175, 6}_2
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_1
c     b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨  b^{175, 6}_0
c  in DIMACS:
 21446  21447  21448  875  21449 0
 21446  21447  21448  875 -21450 0
 21446  21447  21448  875  21451 0

c  -1-1 --> -2
c    ( b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧  b^{175, 5}_0 ∧ -p_875) -> ( b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0)
c  in CNF:
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨  b^{175, 6}_2
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨  b^{175, 6}_1
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨  p_875 ∨ -b^{175, 6}_0
c  in DIMACS:
-21446  21447 -21448  875  21449 0
-21446  21447 -21448  875  21450 0
-21446  21447 -21448  875 -21451 0

c  -2-1 --> break 
c    ( b^{175, 5}_2 ∧  b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧ -p_875) -> break
c  in CNF:
c    -b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨  b^{175, 5}_0 ∨  p_875 ∨ break
c  in DIMACS:
-21446 -21447  21448  875 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 5}_2 ∧ -b^{175, 5}_1 ∧ -b^{175, 5}_0 ∧ true) 
c  in CNF:
c    -b^{175, 5}_2 ∨  b^{175, 5}_1 ∨  b^{175, 5}_0 ∨ false 
c  in DIMACS:
-21446  21447  21448  0

c  3 does not represent an automaton state.
c    -(-b^{175, 5}_2 ∧  b^{175, 5}_1 ∧  b^{175, 5}_0 ∧ true) 
c  in CNF:
c     b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ false 
c  in DIMACS:
 21446 -21447 -21448  0
c  -3 does not represent an automaton state.
c    -( b^{175, 5}_2 ∧  b^{175, 5}_1 ∧  b^{175, 5}_0 ∧ true) 
c  in CNF:
c    -b^{175, 5}_2 ∨ -b^{175, 5}_1 ∨ -b^{175, 5}_0 ∨ false 
c  in DIMACS:
-21446 -21447 -21448  0

c i = 6
c  -2+1 --> -1
c    ( b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧  p_1050) -> ( b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧  b^{175, 7}_0)
c  in CNF:
c    -b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨  b^{175, 7}_2
c    -b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_1
c    -b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨  b^{175, 7}_0
c  in DIMACS:
-21449 -21450  21451 -1050  21452 0
-21449 -21450  21451 -1050 -21453 0
-21449 -21450  21451 -1050  21454 0

c  -1+1 --> 0
c    ( b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0 ∧  p_1050) -> (-b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧ -b^{175, 7}_0)
c  in CNF:
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_2
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_1
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_0
c  in DIMACS:
-21449  21450 -21451 -1050 -21452 0
-21449  21450 -21451 -1050 -21453 0
-21449  21450 -21451 -1050 -21454 0

c  0+1 --> 1
c    (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧  p_1050) -> (-b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧  b^{175, 7}_0)
c  in CNF:
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_2
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_1
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨  b^{175, 7}_0
c  in DIMACS:
 21449  21450  21451 -1050 -21452 0
 21449  21450  21451 -1050 -21453 0
 21449  21450  21451 -1050  21454 0

c  1+1 --> 2
c    (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0 ∧  p_1050) -> (-b^{175, 7}_2 ∧  b^{175, 7}_1 ∧ -b^{175, 7}_0)
c  in CNF:
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_2
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨  b^{175, 7}_1
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ -p_1050 ∨ -b^{175, 7}_0
c  in DIMACS:
 21449  21450 -21451 -1050 -21452 0
 21449  21450 -21451 -1050  21453 0
 21449  21450 -21451 -1050 -21454 0

c  2+1 --> break 
c    (-b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 21449 -21450  21451 -1050 1162 0


c  2-1 --> 1
c    (-b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧ -p_1050) -> (-b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧  b^{175, 7}_0)
c  in CNF:
c     b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_2
c     b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_1
c     b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨  b^{175, 7}_0
c  in DIMACS:
 21449 -21450  21451  1050 -21452 0
 21449 -21450  21451  1050 -21453 0
 21449 -21450  21451  1050  21454 0

c  1-1 --> 0
c    (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0 ∧ -p_1050) -> (-b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧ -b^{175, 7}_0)
c  in CNF:
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_2
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_1
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_0
c  in DIMACS:
 21449  21450 -21451  1050 -21452 0
 21449  21450 -21451  1050 -21453 0
 21449  21450 -21451  1050 -21454 0

c  0-1 --> -1
c    (-b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧ -p_1050) -> ( b^{175, 7}_2 ∧ -b^{175, 7}_1 ∧  b^{175, 7}_0)
c  in CNF:
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨  b^{175, 7}_2
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_1
c     b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨  b^{175, 7}_0
c  in DIMACS:
 21449  21450  21451  1050  21452 0
 21449  21450  21451  1050 -21453 0
 21449  21450  21451  1050  21454 0

c  -1-1 --> -2
c    ( b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧  b^{175, 6}_0 ∧ -p_1050) -> ( b^{175, 7}_2 ∧  b^{175, 7}_1 ∧ -b^{175, 7}_0)
c  in CNF:
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨  b^{175, 7}_2
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨  b^{175, 7}_1
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨  p_1050 ∨ -b^{175, 7}_0
c  in DIMACS:
-21449  21450 -21451  1050  21452 0
-21449  21450 -21451  1050  21453 0
-21449  21450 -21451  1050 -21454 0

c  -2-1 --> break 
c    ( b^{175, 6}_2 ∧  b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨  b^{175, 6}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-21449 -21450  21451  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{175, 6}_2 ∧ -b^{175, 6}_1 ∧ -b^{175, 6}_0 ∧ true) 
c  in CNF:
c    -b^{175, 6}_2 ∨  b^{175, 6}_1 ∨  b^{175, 6}_0 ∨ false 
c  in DIMACS:
-21449  21450  21451  0

c  3 does not represent an automaton state.
c    -(-b^{175, 6}_2 ∧  b^{175, 6}_1 ∧  b^{175, 6}_0 ∧ true) 
c  in CNF:
c     b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ false 
c  in DIMACS:
 21449 -21450 -21451  0
c  -3 does not represent an automaton state.
c    -( b^{175, 6}_2 ∧  b^{175, 6}_1 ∧  b^{175, 6}_0 ∧ true) 
c  in CNF:
c    -b^{175, 6}_2 ∨ -b^{175, 6}_1 ∨ -b^{175, 6}_0 ∨ false 
c  in DIMACS:
-21449 -21450 -21451  0

c INIT for k = 176
c    -b^{176, 1}_2
c    -b^{176, 1}_1
c    -b^{176, 1}_0
c  in DIMACS:
-21455 0
-21456 0
-21457 0

c Transitions for k = 176
c i = 1
c  -2+1 --> -1
c    ( b^{176, 1}_2 ∧  b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧  p_176) -> ( b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0)
c  in CNF:
c    -b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨  b^{176, 2}_2
c    -b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_1
c    -b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨  b^{176, 2}_0
c  in DIMACS:
-21455 -21456  21457 -176  21458 0
-21455 -21456  21457 -176 -21459 0
-21455 -21456  21457 -176  21460 0

c  -1+1 --> 0
c    ( b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧  b^{176, 1}_0 ∧  p_176) -> (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧ -b^{176, 2}_0)
c  in CNF:
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_2
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_1
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_0
c  in DIMACS:
-21455  21456 -21457 -176 -21458 0
-21455  21456 -21457 -176 -21459 0
-21455  21456 -21457 -176 -21460 0

c  0+1 --> 1
c    (-b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧  p_176) -> (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0)
c  in CNF:
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_2
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_1
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨  b^{176, 2}_0
c  in DIMACS:
 21455  21456  21457 -176 -21458 0
 21455  21456  21457 -176 -21459 0
 21455  21456  21457 -176  21460 0

c  1+1 --> 2
c    (-b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧  b^{176, 1}_0 ∧  p_176) -> (-b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0)
c  in CNF:
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_2
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨  b^{176, 2}_1
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ -p_176 ∨ -b^{176, 2}_0
c  in DIMACS:
 21455  21456 -21457 -176 -21458 0
 21455  21456 -21457 -176  21459 0
 21455  21456 -21457 -176 -21460 0

c  2+1 --> break 
c    (-b^{176, 1}_2 ∧  b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧  p_176) -> break
c  in CNF:
c     b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ -p_176 ∨ break
c  in DIMACS:
 21455 -21456  21457 -176 1162 0


c  2-1 --> 1
c    (-b^{176, 1}_2 ∧  b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧ -p_176) -> (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0)
c  in CNF:
c     b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_2
c     b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_1
c     b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨  b^{176, 2}_0
c  in DIMACS:
 21455 -21456  21457  176 -21458 0
 21455 -21456  21457  176 -21459 0
 21455 -21456  21457  176  21460 0

c  1-1 --> 0
c    (-b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧  b^{176, 1}_0 ∧ -p_176) -> (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧ -b^{176, 2}_0)
c  in CNF:
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_2
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_1
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_0
c  in DIMACS:
 21455  21456 -21457  176 -21458 0
 21455  21456 -21457  176 -21459 0
 21455  21456 -21457  176 -21460 0

c  0-1 --> -1
c    (-b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧ -p_176) -> ( b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0)
c  in CNF:
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨  b^{176, 2}_2
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_1
c     b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨  b^{176, 2}_0
c  in DIMACS:
 21455  21456  21457  176  21458 0
 21455  21456  21457  176 -21459 0
 21455  21456  21457  176  21460 0

c  -1-1 --> -2
c    ( b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧  b^{176, 1}_0 ∧ -p_176) -> ( b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0)
c  in CNF:
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨  b^{176, 2}_2
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨  b^{176, 2}_1
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨  p_176 ∨ -b^{176, 2}_0
c  in DIMACS:
-21455  21456 -21457  176  21458 0
-21455  21456 -21457  176  21459 0
-21455  21456 -21457  176 -21460 0

c  -2-1 --> break 
c    ( b^{176, 1}_2 ∧  b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧ -p_176) -> break
c  in CNF:
c    -b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨  b^{176, 1}_0 ∨  p_176 ∨ break
c  in DIMACS:
-21455 -21456  21457  176 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 1}_2 ∧ -b^{176, 1}_1 ∧ -b^{176, 1}_0 ∧ true) 
c  in CNF:
c    -b^{176, 1}_2 ∨  b^{176, 1}_1 ∨  b^{176, 1}_0 ∨ false 
c  in DIMACS:
-21455  21456  21457  0

c  3 does not represent an automaton state.
c    -(-b^{176, 1}_2 ∧  b^{176, 1}_1 ∧  b^{176, 1}_0 ∧ true) 
c  in CNF:
c     b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ false 
c  in DIMACS:
 21455 -21456 -21457  0
c  -3 does not represent an automaton state.
c    -( b^{176, 1}_2 ∧  b^{176, 1}_1 ∧  b^{176, 1}_0 ∧ true) 
c  in CNF:
c    -b^{176, 1}_2 ∨ -b^{176, 1}_1 ∨ -b^{176, 1}_0 ∨ false 
c  in DIMACS:
-21455 -21456 -21457  0

c i = 2
c  -2+1 --> -1
c    ( b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧  p_352) -> ( b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0)
c  in CNF:
c    -b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨  b^{176, 3}_2
c    -b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_1
c    -b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨  b^{176, 3}_0
c  in DIMACS:
-21458 -21459  21460 -352  21461 0
-21458 -21459  21460 -352 -21462 0
-21458 -21459  21460 -352  21463 0

c  -1+1 --> 0
c    ( b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0 ∧  p_352) -> (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧ -b^{176, 3}_0)
c  in CNF:
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_2
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_1
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_0
c  in DIMACS:
-21458  21459 -21460 -352 -21461 0
-21458  21459 -21460 -352 -21462 0
-21458  21459 -21460 -352 -21463 0

c  0+1 --> 1
c    (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧  p_352) -> (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0)
c  in CNF:
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_2
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_1
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨  b^{176, 3}_0
c  in DIMACS:
 21458  21459  21460 -352 -21461 0
 21458  21459  21460 -352 -21462 0
 21458  21459  21460 -352  21463 0

c  1+1 --> 2
c    (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0 ∧  p_352) -> (-b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0)
c  in CNF:
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_2
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨  b^{176, 3}_1
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ -p_352 ∨ -b^{176, 3}_0
c  in DIMACS:
 21458  21459 -21460 -352 -21461 0
 21458  21459 -21460 -352  21462 0
 21458  21459 -21460 -352 -21463 0

c  2+1 --> break 
c    (-b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧  p_352) -> break
c  in CNF:
c     b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 21458 -21459  21460 -352 1162 0


c  2-1 --> 1
c    (-b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧ -p_352) -> (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0)
c  in CNF:
c     b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_2
c     b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_1
c     b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨  b^{176, 3}_0
c  in DIMACS:
 21458 -21459  21460  352 -21461 0
 21458 -21459  21460  352 -21462 0
 21458 -21459  21460  352  21463 0

c  1-1 --> 0
c    (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0 ∧ -p_352) -> (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧ -b^{176, 3}_0)
c  in CNF:
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_2
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_1
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_0
c  in DIMACS:
 21458  21459 -21460  352 -21461 0
 21458  21459 -21460  352 -21462 0
 21458  21459 -21460  352 -21463 0

c  0-1 --> -1
c    (-b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧ -p_352) -> ( b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0)
c  in CNF:
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨  b^{176, 3}_2
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_1
c     b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨  b^{176, 3}_0
c  in DIMACS:
 21458  21459  21460  352  21461 0
 21458  21459  21460  352 -21462 0
 21458  21459  21460  352  21463 0

c  -1-1 --> -2
c    ( b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧  b^{176, 2}_0 ∧ -p_352) -> ( b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0)
c  in CNF:
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨  b^{176, 3}_2
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨  b^{176, 3}_1
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨  p_352 ∨ -b^{176, 3}_0
c  in DIMACS:
-21458  21459 -21460  352  21461 0
-21458  21459 -21460  352  21462 0
-21458  21459 -21460  352 -21463 0

c  -2-1 --> break 
c    ( b^{176, 2}_2 ∧  b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨  b^{176, 2}_0 ∨  p_352 ∨ break
c  in DIMACS:
-21458 -21459  21460  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 2}_2 ∧ -b^{176, 2}_1 ∧ -b^{176, 2}_0 ∧ true) 
c  in CNF:
c    -b^{176, 2}_2 ∨  b^{176, 2}_1 ∨  b^{176, 2}_0 ∨ false 
c  in DIMACS:
-21458  21459  21460  0

c  3 does not represent an automaton state.
c    -(-b^{176, 2}_2 ∧  b^{176, 2}_1 ∧  b^{176, 2}_0 ∧ true) 
c  in CNF:
c     b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ false 
c  in DIMACS:
 21458 -21459 -21460  0
c  -3 does not represent an automaton state.
c    -( b^{176, 2}_2 ∧  b^{176, 2}_1 ∧  b^{176, 2}_0 ∧ true) 
c  in CNF:
c    -b^{176, 2}_2 ∨ -b^{176, 2}_1 ∨ -b^{176, 2}_0 ∨ false 
c  in DIMACS:
-21458 -21459 -21460  0

c i = 3
c  -2+1 --> -1
c    ( b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧  p_528) -> ( b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0)
c  in CNF:
c    -b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨  b^{176, 4}_2
c    -b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_1
c    -b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨  b^{176, 4}_0
c  in DIMACS:
-21461 -21462  21463 -528  21464 0
-21461 -21462  21463 -528 -21465 0
-21461 -21462  21463 -528  21466 0

c  -1+1 --> 0
c    ( b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0 ∧  p_528) -> (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧ -b^{176, 4}_0)
c  in CNF:
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_2
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_1
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_0
c  in DIMACS:
-21461  21462 -21463 -528 -21464 0
-21461  21462 -21463 -528 -21465 0
-21461  21462 -21463 -528 -21466 0

c  0+1 --> 1
c    (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧  p_528) -> (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0)
c  in CNF:
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_2
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_1
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨  b^{176, 4}_0
c  in DIMACS:
 21461  21462  21463 -528 -21464 0
 21461  21462  21463 -528 -21465 0
 21461  21462  21463 -528  21466 0

c  1+1 --> 2
c    (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0 ∧  p_528) -> (-b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0)
c  in CNF:
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_2
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨  b^{176, 4}_1
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ -p_528 ∨ -b^{176, 4}_0
c  in DIMACS:
 21461  21462 -21463 -528 -21464 0
 21461  21462 -21463 -528  21465 0
 21461  21462 -21463 -528 -21466 0

c  2+1 --> break 
c    (-b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧  p_528) -> break
c  in CNF:
c     b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 21461 -21462  21463 -528 1162 0


c  2-1 --> 1
c    (-b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧ -p_528) -> (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0)
c  in CNF:
c     b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_2
c     b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_1
c     b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨  b^{176, 4}_0
c  in DIMACS:
 21461 -21462  21463  528 -21464 0
 21461 -21462  21463  528 -21465 0
 21461 -21462  21463  528  21466 0

c  1-1 --> 0
c    (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0 ∧ -p_528) -> (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧ -b^{176, 4}_0)
c  in CNF:
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_2
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_1
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_0
c  in DIMACS:
 21461  21462 -21463  528 -21464 0
 21461  21462 -21463  528 -21465 0
 21461  21462 -21463  528 -21466 0

c  0-1 --> -1
c    (-b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧ -p_528) -> ( b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0)
c  in CNF:
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨  b^{176, 4}_2
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_1
c     b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨  b^{176, 4}_0
c  in DIMACS:
 21461  21462  21463  528  21464 0
 21461  21462  21463  528 -21465 0
 21461  21462  21463  528  21466 0

c  -1-1 --> -2
c    ( b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧  b^{176, 3}_0 ∧ -p_528) -> ( b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0)
c  in CNF:
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨  b^{176, 4}_2
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨  b^{176, 4}_1
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨  p_528 ∨ -b^{176, 4}_0
c  in DIMACS:
-21461  21462 -21463  528  21464 0
-21461  21462 -21463  528  21465 0
-21461  21462 -21463  528 -21466 0

c  -2-1 --> break 
c    ( b^{176, 3}_2 ∧  b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨  b^{176, 3}_0 ∨  p_528 ∨ break
c  in DIMACS:
-21461 -21462  21463  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 3}_2 ∧ -b^{176, 3}_1 ∧ -b^{176, 3}_0 ∧ true) 
c  in CNF:
c    -b^{176, 3}_2 ∨  b^{176, 3}_1 ∨  b^{176, 3}_0 ∨ false 
c  in DIMACS:
-21461  21462  21463  0

c  3 does not represent an automaton state.
c    -(-b^{176, 3}_2 ∧  b^{176, 3}_1 ∧  b^{176, 3}_0 ∧ true) 
c  in CNF:
c     b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ false 
c  in DIMACS:
 21461 -21462 -21463  0
c  -3 does not represent an automaton state.
c    -( b^{176, 3}_2 ∧  b^{176, 3}_1 ∧  b^{176, 3}_0 ∧ true) 
c  in CNF:
c    -b^{176, 3}_2 ∨ -b^{176, 3}_1 ∨ -b^{176, 3}_0 ∨ false 
c  in DIMACS:
-21461 -21462 -21463  0

c i = 4
c  -2+1 --> -1
c    ( b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧  p_704) -> ( b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0)
c  in CNF:
c    -b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨  b^{176, 5}_2
c    -b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_1
c    -b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨  b^{176, 5}_0
c  in DIMACS:
-21464 -21465  21466 -704  21467 0
-21464 -21465  21466 -704 -21468 0
-21464 -21465  21466 -704  21469 0

c  -1+1 --> 0
c    ( b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0 ∧  p_704) -> (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧ -b^{176, 5}_0)
c  in CNF:
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_2
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_1
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_0
c  in DIMACS:
-21464  21465 -21466 -704 -21467 0
-21464  21465 -21466 -704 -21468 0
-21464  21465 -21466 -704 -21469 0

c  0+1 --> 1
c    (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧  p_704) -> (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0)
c  in CNF:
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_2
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_1
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨  b^{176, 5}_0
c  in DIMACS:
 21464  21465  21466 -704 -21467 0
 21464  21465  21466 -704 -21468 0
 21464  21465  21466 -704  21469 0

c  1+1 --> 2
c    (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0 ∧  p_704) -> (-b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0)
c  in CNF:
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_2
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨  b^{176, 5}_1
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ -p_704 ∨ -b^{176, 5}_0
c  in DIMACS:
 21464  21465 -21466 -704 -21467 0
 21464  21465 -21466 -704  21468 0
 21464  21465 -21466 -704 -21469 0

c  2+1 --> break 
c    (-b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧  p_704) -> break
c  in CNF:
c     b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 21464 -21465  21466 -704 1162 0


c  2-1 --> 1
c    (-b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧ -p_704) -> (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0)
c  in CNF:
c     b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_2
c     b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_1
c     b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨  b^{176, 5}_0
c  in DIMACS:
 21464 -21465  21466  704 -21467 0
 21464 -21465  21466  704 -21468 0
 21464 -21465  21466  704  21469 0

c  1-1 --> 0
c    (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0 ∧ -p_704) -> (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧ -b^{176, 5}_0)
c  in CNF:
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_2
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_1
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_0
c  in DIMACS:
 21464  21465 -21466  704 -21467 0
 21464  21465 -21466  704 -21468 0
 21464  21465 -21466  704 -21469 0

c  0-1 --> -1
c    (-b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧ -p_704) -> ( b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0)
c  in CNF:
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨  b^{176, 5}_2
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_1
c     b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨  b^{176, 5}_0
c  in DIMACS:
 21464  21465  21466  704  21467 0
 21464  21465  21466  704 -21468 0
 21464  21465  21466  704  21469 0

c  -1-1 --> -2
c    ( b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧  b^{176, 4}_0 ∧ -p_704) -> ( b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0)
c  in CNF:
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨  b^{176, 5}_2
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨  b^{176, 5}_1
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨  p_704 ∨ -b^{176, 5}_0
c  in DIMACS:
-21464  21465 -21466  704  21467 0
-21464  21465 -21466  704  21468 0
-21464  21465 -21466  704 -21469 0

c  -2-1 --> break 
c    ( b^{176, 4}_2 ∧  b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨  b^{176, 4}_0 ∨  p_704 ∨ break
c  in DIMACS:
-21464 -21465  21466  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 4}_2 ∧ -b^{176, 4}_1 ∧ -b^{176, 4}_0 ∧ true) 
c  in CNF:
c    -b^{176, 4}_2 ∨  b^{176, 4}_1 ∨  b^{176, 4}_0 ∨ false 
c  in DIMACS:
-21464  21465  21466  0

c  3 does not represent an automaton state.
c    -(-b^{176, 4}_2 ∧  b^{176, 4}_1 ∧  b^{176, 4}_0 ∧ true) 
c  in CNF:
c     b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ false 
c  in DIMACS:
 21464 -21465 -21466  0
c  -3 does not represent an automaton state.
c    -( b^{176, 4}_2 ∧  b^{176, 4}_1 ∧  b^{176, 4}_0 ∧ true) 
c  in CNF:
c    -b^{176, 4}_2 ∨ -b^{176, 4}_1 ∨ -b^{176, 4}_0 ∨ false 
c  in DIMACS:
-21464 -21465 -21466  0

c i = 5
c  -2+1 --> -1
c    ( b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧  p_880) -> ( b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0)
c  in CNF:
c    -b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨  b^{176, 6}_2
c    -b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_1
c    -b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨  b^{176, 6}_0
c  in DIMACS:
-21467 -21468  21469 -880  21470 0
-21467 -21468  21469 -880 -21471 0
-21467 -21468  21469 -880  21472 0

c  -1+1 --> 0
c    ( b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0 ∧  p_880) -> (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧ -b^{176, 6}_0)
c  in CNF:
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_2
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_1
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_0
c  in DIMACS:
-21467  21468 -21469 -880 -21470 0
-21467  21468 -21469 -880 -21471 0
-21467  21468 -21469 -880 -21472 0

c  0+1 --> 1
c    (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧  p_880) -> (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0)
c  in CNF:
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_2
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_1
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨  b^{176, 6}_0
c  in DIMACS:
 21467  21468  21469 -880 -21470 0
 21467  21468  21469 -880 -21471 0
 21467  21468  21469 -880  21472 0

c  1+1 --> 2
c    (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0 ∧  p_880) -> (-b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0)
c  in CNF:
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_2
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨  b^{176, 6}_1
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ -p_880 ∨ -b^{176, 6}_0
c  in DIMACS:
 21467  21468 -21469 -880 -21470 0
 21467  21468 -21469 -880  21471 0
 21467  21468 -21469 -880 -21472 0

c  2+1 --> break 
c    (-b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧  p_880) -> break
c  in CNF:
c     b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 21467 -21468  21469 -880 1162 0


c  2-1 --> 1
c    (-b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧ -p_880) -> (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0)
c  in CNF:
c     b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_2
c     b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_1
c     b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨  b^{176, 6}_0
c  in DIMACS:
 21467 -21468  21469  880 -21470 0
 21467 -21468  21469  880 -21471 0
 21467 -21468  21469  880  21472 0

c  1-1 --> 0
c    (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0 ∧ -p_880) -> (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧ -b^{176, 6}_0)
c  in CNF:
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_2
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_1
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_0
c  in DIMACS:
 21467  21468 -21469  880 -21470 0
 21467  21468 -21469  880 -21471 0
 21467  21468 -21469  880 -21472 0

c  0-1 --> -1
c    (-b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧ -p_880) -> ( b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0)
c  in CNF:
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨  b^{176, 6}_2
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_1
c     b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨  b^{176, 6}_0
c  in DIMACS:
 21467  21468  21469  880  21470 0
 21467  21468  21469  880 -21471 0
 21467  21468  21469  880  21472 0

c  -1-1 --> -2
c    ( b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧  b^{176, 5}_0 ∧ -p_880) -> ( b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0)
c  in CNF:
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨  b^{176, 6}_2
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨  b^{176, 6}_1
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨  p_880 ∨ -b^{176, 6}_0
c  in DIMACS:
-21467  21468 -21469  880  21470 0
-21467  21468 -21469  880  21471 0
-21467  21468 -21469  880 -21472 0

c  -2-1 --> break 
c    ( b^{176, 5}_2 ∧  b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨  b^{176, 5}_0 ∨  p_880 ∨ break
c  in DIMACS:
-21467 -21468  21469  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 5}_2 ∧ -b^{176, 5}_1 ∧ -b^{176, 5}_0 ∧ true) 
c  in CNF:
c    -b^{176, 5}_2 ∨  b^{176, 5}_1 ∨  b^{176, 5}_0 ∨ false 
c  in DIMACS:
-21467  21468  21469  0

c  3 does not represent an automaton state.
c    -(-b^{176, 5}_2 ∧  b^{176, 5}_1 ∧  b^{176, 5}_0 ∧ true) 
c  in CNF:
c     b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ false 
c  in DIMACS:
 21467 -21468 -21469  0
c  -3 does not represent an automaton state.
c    -( b^{176, 5}_2 ∧  b^{176, 5}_1 ∧  b^{176, 5}_0 ∧ true) 
c  in CNF:
c    -b^{176, 5}_2 ∨ -b^{176, 5}_1 ∨ -b^{176, 5}_0 ∨ false 
c  in DIMACS:
-21467 -21468 -21469  0

c i = 6
c  -2+1 --> -1
c    ( b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧  p_1056) -> ( b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧  b^{176, 7}_0)
c  in CNF:
c    -b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨  b^{176, 7}_2
c    -b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_1
c    -b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨  b^{176, 7}_0
c  in DIMACS:
-21470 -21471  21472 -1056  21473 0
-21470 -21471  21472 -1056 -21474 0
-21470 -21471  21472 -1056  21475 0

c  -1+1 --> 0
c    ( b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0 ∧  p_1056) -> (-b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧ -b^{176, 7}_0)
c  in CNF:
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_2
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_1
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_0
c  in DIMACS:
-21470  21471 -21472 -1056 -21473 0
-21470  21471 -21472 -1056 -21474 0
-21470  21471 -21472 -1056 -21475 0

c  0+1 --> 1
c    (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧  p_1056) -> (-b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧  b^{176, 7}_0)
c  in CNF:
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_2
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_1
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨  b^{176, 7}_0
c  in DIMACS:
 21470  21471  21472 -1056 -21473 0
 21470  21471  21472 -1056 -21474 0
 21470  21471  21472 -1056  21475 0

c  1+1 --> 2
c    (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0 ∧  p_1056) -> (-b^{176, 7}_2 ∧  b^{176, 7}_1 ∧ -b^{176, 7}_0)
c  in CNF:
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_2
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨  b^{176, 7}_1
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ -p_1056 ∨ -b^{176, 7}_0
c  in DIMACS:
 21470  21471 -21472 -1056 -21473 0
 21470  21471 -21472 -1056  21474 0
 21470  21471 -21472 -1056 -21475 0

c  2+1 --> break 
c    (-b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 21470 -21471  21472 -1056 1162 0


c  2-1 --> 1
c    (-b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧ -p_1056) -> (-b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧  b^{176, 7}_0)
c  in CNF:
c     b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_2
c     b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_1
c     b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨  b^{176, 7}_0
c  in DIMACS:
 21470 -21471  21472  1056 -21473 0
 21470 -21471  21472  1056 -21474 0
 21470 -21471  21472  1056  21475 0

c  1-1 --> 0
c    (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0 ∧ -p_1056) -> (-b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧ -b^{176, 7}_0)
c  in CNF:
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_2
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_1
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_0
c  in DIMACS:
 21470  21471 -21472  1056 -21473 0
 21470  21471 -21472  1056 -21474 0
 21470  21471 -21472  1056 -21475 0

c  0-1 --> -1
c    (-b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧ -p_1056) -> ( b^{176, 7}_2 ∧ -b^{176, 7}_1 ∧  b^{176, 7}_0)
c  in CNF:
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨  b^{176, 7}_2
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_1
c     b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨  b^{176, 7}_0
c  in DIMACS:
 21470  21471  21472  1056  21473 0
 21470  21471  21472  1056 -21474 0
 21470  21471  21472  1056  21475 0

c  -1-1 --> -2
c    ( b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧  b^{176, 6}_0 ∧ -p_1056) -> ( b^{176, 7}_2 ∧  b^{176, 7}_1 ∧ -b^{176, 7}_0)
c  in CNF:
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨  b^{176, 7}_2
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨  b^{176, 7}_1
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨  p_1056 ∨ -b^{176, 7}_0
c  in DIMACS:
-21470  21471 -21472  1056  21473 0
-21470  21471 -21472  1056  21474 0
-21470  21471 -21472  1056 -21475 0

c  -2-1 --> break 
c    ( b^{176, 6}_2 ∧  b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨  b^{176, 6}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-21470 -21471  21472  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{176, 6}_2 ∧ -b^{176, 6}_1 ∧ -b^{176, 6}_0 ∧ true) 
c  in CNF:
c    -b^{176, 6}_2 ∨  b^{176, 6}_1 ∨  b^{176, 6}_0 ∨ false 
c  in DIMACS:
-21470  21471  21472  0

c  3 does not represent an automaton state.
c    -(-b^{176, 6}_2 ∧  b^{176, 6}_1 ∧  b^{176, 6}_0 ∧ true) 
c  in CNF:
c     b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ false 
c  in DIMACS:
 21470 -21471 -21472  0
c  -3 does not represent an automaton state.
c    -( b^{176, 6}_2 ∧  b^{176, 6}_1 ∧  b^{176, 6}_0 ∧ true) 
c  in CNF:
c    -b^{176, 6}_2 ∨ -b^{176, 6}_1 ∨ -b^{176, 6}_0 ∨ false 
c  in DIMACS:
-21470 -21471 -21472  0

c INIT for k = 177
c    -b^{177, 1}_2
c    -b^{177, 1}_1
c    -b^{177, 1}_0
c  in DIMACS:
-21476 0
-21477 0
-21478 0

c Transitions for k = 177
c i = 1
c  -2+1 --> -1
c    ( b^{177, 1}_2 ∧  b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧  p_177) -> ( b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0)
c  in CNF:
c    -b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨  b^{177, 2}_2
c    -b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_1
c    -b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨  b^{177, 2}_0
c  in DIMACS:
-21476 -21477  21478 -177  21479 0
-21476 -21477  21478 -177 -21480 0
-21476 -21477  21478 -177  21481 0

c  -1+1 --> 0
c    ( b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧  b^{177, 1}_0 ∧  p_177) -> (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧ -b^{177, 2}_0)
c  in CNF:
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_2
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_1
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_0
c  in DIMACS:
-21476  21477 -21478 -177 -21479 0
-21476  21477 -21478 -177 -21480 0
-21476  21477 -21478 -177 -21481 0

c  0+1 --> 1
c    (-b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧  p_177) -> (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0)
c  in CNF:
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_2
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_1
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨  b^{177, 2}_0
c  in DIMACS:
 21476  21477  21478 -177 -21479 0
 21476  21477  21478 -177 -21480 0
 21476  21477  21478 -177  21481 0

c  1+1 --> 2
c    (-b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧  b^{177, 1}_0 ∧  p_177) -> (-b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0)
c  in CNF:
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_2
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨  b^{177, 2}_1
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ -p_177 ∨ -b^{177, 2}_0
c  in DIMACS:
 21476  21477 -21478 -177 -21479 0
 21476  21477 -21478 -177  21480 0
 21476  21477 -21478 -177 -21481 0

c  2+1 --> break 
c    (-b^{177, 1}_2 ∧  b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧  p_177) -> break
c  in CNF:
c     b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ -p_177 ∨ break
c  in DIMACS:
 21476 -21477  21478 -177 1162 0


c  2-1 --> 1
c    (-b^{177, 1}_2 ∧  b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧ -p_177) -> (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0)
c  in CNF:
c     b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_2
c     b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_1
c     b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨  b^{177, 2}_0
c  in DIMACS:
 21476 -21477  21478  177 -21479 0
 21476 -21477  21478  177 -21480 0
 21476 -21477  21478  177  21481 0

c  1-1 --> 0
c    (-b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧  b^{177, 1}_0 ∧ -p_177) -> (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧ -b^{177, 2}_0)
c  in CNF:
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_2
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_1
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_0
c  in DIMACS:
 21476  21477 -21478  177 -21479 0
 21476  21477 -21478  177 -21480 0
 21476  21477 -21478  177 -21481 0

c  0-1 --> -1
c    (-b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧ -p_177) -> ( b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0)
c  in CNF:
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨  b^{177, 2}_2
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_1
c     b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨  b^{177, 2}_0
c  in DIMACS:
 21476  21477  21478  177  21479 0
 21476  21477  21478  177 -21480 0
 21476  21477  21478  177  21481 0

c  -1-1 --> -2
c    ( b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧  b^{177, 1}_0 ∧ -p_177) -> ( b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0)
c  in CNF:
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨  b^{177, 2}_2
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨  b^{177, 2}_1
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨  p_177 ∨ -b^{177, 2}_0
c  in DIMACS:
-21476  21477 -21478  177  21479 0
-21476  21477 -21478  177  21480 0
-21476  21477 -21478  177 -21481 0

c  -2-1 --> break 
c    ( b^{177, 1}_2 ∧  b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧ -p_177) -> break
c  in CNF:
c    -b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨  b^{177, 1}_0 ∨  p_177 ∨ break
c  in DIMACS:
-21476 -21477  21478  177 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 1}_2 ∧ -b^{177, 1}_1 ∧ -b^{177, 1}_0 ∧ true) 
c  in CNF:
c    -b^{177, 1}_2 ∨  b^{177, 1}_1 ∨  b^{177, 1}_0 ∨ false 
c  in DIMACS:
-21476  21477  21478  0

c  3 does not represent an automaton state.
c    -(-b^{177, 1}_2 ∧  b^{177, 1}_1 ∧  b^{177, 1}_0 ∧ true) 
c  in CNF:
c     b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ false 
c  in DIMACS:
 21476 -21477 -21478  0
c  -3 does not represent an automaton state.
c    -( b^{177, 1}_2 ∧  b^{177, 1}_1 ∧  b^{177, 1}_0 ∧ true) 
c  in CNF:
c    -b^{177, 1}_2 ∨ -b^{177, 1}_1 ∨ -b^{177, 1}_0 ∨ false 
c  in DIMACS:
-21476 -21477 -21478  0

c i = 2
c  -2+1 --> -1
c    ( b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧  p_354) -> ( b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0)
c  in CNF:
c    -b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨  b^{177, 3}_2
c    -b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_1
c    -b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨  b^{177, 3}_0
c  in DIMACS:
-21479 -21480  21481 -354  21482 0
-21479 -21480  21481 -354 -21483 0
-21479 -21480  21481 -354  21484 0

c  -1+1 --> 0
c    ( b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0 ∧  p_354) -> (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧ -b^{177, 3}_0)
c  in CNF:
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_2
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_1
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_0
c  in DIMACS:
-21479  21480 -21481 -354 -21482 0
-21479  21480 -21481 -354 -21483 0
-21479  21480 -21481 -354 -21484 0

c  0+1 --> 1
c    (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧  p_354) -> (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0)
c  in CNF:
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_2
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_1
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨  b^{177, 3}_0
c  in DIMACS:
 21479  21480  21481 -354 -21482 0
 21479  21480  21481 -354 -21483 0
 21479  21480  21481 -354  21484 0

c  1+1 --> 2
c    (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0 ∧  p_354) -> (-b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0)
c  in CNF:
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_2
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨  b^{177, 3}_1
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ -p_354 ∨ -b^{177, 3}_0
c  in DIMACS:
 21479  21480 -21481 -354 -21482 0
 21479  21480 -21481 -354  21483 0
 21479  21480 -21481 -354 -21484 0

c  2+1 --> break 
c    (-b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧  p_354) -> break
c  in CNF:
c     b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 21479 -21480  21481 -354 1162 0


c  2-1 --> 1
c    (-b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧ -p_354) -> (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0)
c  in CNF:
c     b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_2
c     b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_1
c     b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨  b^{177, 3}_0
c  in DIMACS:
 21479 -21480  21481  354 -21482 0
 21479 -21480  21481  354 -21483 0
 21479 -21480  21481  354  21484 0

c  1-1 --> 0
c    (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0 ∧ -p_354) -> (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧ -b^{177, 3}_0)
c  in CNF:
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_2
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_1
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_0
c  in DIMACS:
 21479  21480 -21481  354 -21482 0
 21479  21480 -21481  354 -21483 0
 21479  21480 -21481  354 -21484 0

c  0-1 --> -1
c    (-b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧ -p_354) -> ( b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0)
c  in CNF:
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨  b^{177, 3}_2
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_1
c     b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨  b^{177, 3}_0
c  in DIMACS:
 21479  21480  21481  354  21482 0
 21479  21480  21481  354 -21483 0
 21479  21480  21481  354  21484 0

c  -1-1 --> -2
c    ( b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧  b^{177, 2}_0 ∧ -p_354) -> ( b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0)
c  in CNF:
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨  b^{177, 3}_2
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨  b^{177, 3}_1
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨  p_354 ∨ -b^{177, 3}_0
c  in DIMACS:
-21479  21480 -21481  354  21482 0
-21479  21480 -21481  354  21483 0
-21479  21480 -21481  354 -21484 0

c  -2-1 --> break 
c    ( b^{177, 2}_2 ∧  b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨  b^{177, 2}_0 ∨  p_354 ∨ break
c  in DIMACS:
-21479 -21480  21481  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 2}_2 ∧ -b^{177, 2}_1 ∧ -b^{177, 2}_0 ∧ true) 
c  in CNF:
c    -b^{177, 2}_2 ∨  b^{177, 2}_1 ∨  b^{177, 2}_0 ∨ false 
c  in DIMACS:
-21479  21480  21481  0

c  3 does not represent an automaton state.
c    -(-b^{177, 2}_2 ∧  b^{177, 2}_1 ∧  b^{177, 2}_0 ∧ true) 
c  in CNF:
c     b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ false 
c  in DIMACS:
 21479 -21480 -21481  0
c  -3 does not represent an automaton state.
c    -( b^{177, 2}_2 ∧  b^{177, 2}_1 ∧  b^{177, 2}_0 ∧ true) 
c  in CNF:
c    -b^{177, 2}_2 ∨ -b^{177, 2}_1 ∨ -b^{177, 2}_0 ∨ false 
c  in DIMACS:
-21479 -21480 -21481  0

c i = 3
c  -2+1 --> -1
c    ( b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧  p_531) -> ( b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0)
c  in CNF:
c    -b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨  b^{177, 4}_2
c    -b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_1
c    -b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨  b^{177, 4}_0
c  in DIMACS:
-21482 -21483  21484 -531  21485 0
-21482 -21483  21484 -531 -21486 0
-21482 -21483  21484 -531  21487 0

c  -1+1 --> 0
c    ( b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0 ∧  p_531) -> (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧ -b^{177, 4}_0)
c  in CNF:
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_2
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_1
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_0
c  in DIMACS:
-21482  21483 -21484 -531 -21485 0
-21482  21483 -21484 -531 -21486 0
-21482  21483 -21484 -531 -21487 0

c  0+1 --> 1
c    (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧  p_531) -> (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0)
c  in CNF:
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_2
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_1
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨  b^{177, 4}_0
c  in DIMACS:
 21482  21483  21484 -531 -21485 0
 21482  21483  21484 -531 -21486 0
 21482  21483  21484 -531  21487 0

c  1+1 --> 2
c    (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0 ∧  p_531) -> (-b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0)
c  in CNF:
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_2
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨  b^{177, 4}_1
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ -p_531 ∨ -b^{177, 4}_0
c  in DIMACS:
 21482  21483 -21484 -531 -21485 0
 21482  21483 -21484 -531  21486 0
 21482  21483 -21484 -531 -21487 0

c  2+1 --> break 
c    (-b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧  p_531) -> break
c  in CNF:
c     b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ -p_531 ∨ break
c  in DIMACS:
 21482 -21483  21484 -531 1162 0


c  2-1 --> 1
c    (-b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧ -p_531) -> (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0)
c  in CNF:
c     b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_2
c     b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_1
c     b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨  b^{177, 4}_0
c  in DIMACS:
 21482 -21483  21484  531 -21485 0
 21482 -21483  21484  531 -21486 0
 21482 -21483  21484  531  21487 0

c  1-1 --> 0
c    (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0 ∧ -p_531) -> (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧ -b^{177, 4}_0)
c  in CNF:
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_2
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_1
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_0
c  in DIMACS:
 21482  21483 -21484  531 -21485 0
 21482  21483 -21484  531 -21486 0
 21482  21483 -21484  531 -21487 0

c  0-1 --> -1
c    (-b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧ -p_531) -> ( b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0)
c  in CNF:
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨  b^{177, 4}_2
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_1
c     b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨  b^{177, 4}_0
c  in DIMACS:
 21482  21483  21484  531  21485 0
 21482  21483  21484  531 -21486 0
 21482  21483  21484  531  21487 0

c  -1-1 --> -2
c    ( b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧  b^{177, 3}_0 ∧ -p_531) -> ( b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0)
c  in CNF:
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨  b^{177, 4}_2
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨  b^{177, 4}_1
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨  p_531 ∨ -b^{177, 4}_0
c  in DIMACS:
-21482  21483 -21484  531  21485 0
-21482  21483 -21484  531  21486 0
-21482  21483 -21484  531 -21487 0

c  -2-1 --> break 
c    ( b^{177, 3}_2 ∧  b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧ -p_531) -> break
c  in CNF:
c    -b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨  b^{177, 3}_0 ∨  p_531 ∨ break
c  in DIMACS:
-21482 -21483  21484  531 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 3}_2 ∧ -b^{177, 3}_1 ∧ -b^{177, 3}_0 ∧ true) 
c  in CNF:
c    -b^{177, 3}_2 ∨  b^{177, 3}_1 ∨  b^{177, 3}_0 ∨ false 
c  in DIMACS:
-21482  21483  21484  0

c  3 does not represent an automaton state.
c    -(-b^{177, 3}_2 ∧  b^{177, 3}_1 ∧  b^{177, 3}_0 ∧ true) 
c  in CNF:
c     b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ false 
c  in DIMACS:
 21482 -21483 -21484  0
c  -3 does not represent an automaton state.
c    -( b^{177, 3}_2 ∧  b^{177, 3}_1 ∧  b^{177, 3}_0 ∧ true) 
c  in CNF:
c    -b^{177, 3}_2 ∨ -b^{177, 3}_1 ∨ -b^{177, 3}_0 ∨ false 
c  in DIMACS:
-21482 -21483 -21484  0

c i = 4
c  -2+1 --> -1
c    ( b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧  p_708) -> ( b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0)
c  in CNF:
c    -b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨  b^{177, 5}_2
c    -b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_1
c    -b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨  b^{177, 5}_0
c  in DIMACS:
-21485 -21486  21487 -708  21488 0
-21485 -21486  21487 -708 -21489 0
-21485 -21486  21487 -708  21490 0

c  -1+1 --> 0
c    ( b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0 ∧  p_708) -> (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧ -b^{177, 5}_0)
c  in CNF:
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_2
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_1
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_0
c  in DIMACS:
-21485  21486 -21487 -708 -21488 0
-21485  21486 -21487 -708 -21489 0
-21485  21486 -21487 -708 -21490 0

c  0+1 --> 1
c    (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧  p_708) -> (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0)
c  in CNF:
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_2
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_1
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨  b^{177, 5}_0
c  in DIMACS:
 21485  21486  21487 -708 -21488 0
 21485  21486  21487 -708 -21489 0
 21485  21486  21487 -708  21490 0

c  1+1 --> 2
c    (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0 ∧  p_708) -> (-b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0)
c  in CNF:
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_2
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨  b^{177, 5}_1
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ -p_708 ∨ -b^{177, 5}_0
c  in DIMACS:
 21485  21486 -21487 -708 -21488 0
 21485  21486 -21487 -708  21489 0
 21485  21486 -21487 -708 -21490 0

c  2+1 --> break 
c    (-b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧  p_708) -> break
c  in CNF:
c     b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 21485 -21486  21487 -708 1162 0


c  2-1 --> 1
c    (-b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧ -p_708) -> (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0)
c  in CNF:
c     b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_2
c     b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_1
c     b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨  b^{177, 5}_0
c  in DIMACS:
 21485 -21486  21487  708 -21488 0
 21485 -21486  21487  708 -21489 0
 21485 -21486  21487  708  21490 0

c  1-1 --> 0
c    (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0 ∧ -p_708) -> (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧ -b^{177, 5}_0)
c  in CNF:
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_2
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_1
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_0
c  in DIMACS:
 21485  21486 -21487  708 -21488 0
 21485  21486 -21487  708 -21489 0
 21485  21486 -21487  708 -21490 0

c  0-1 --> -1
c    (-b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧ -p_708) -> ( b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0)
c  in CNF:
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨  b^{177, 5}_2
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_1
c     b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨  b^{177, 5}_0
c  in DIMACS:
 21485  21486  21487  708  21488 0
 21485  21486  21487  708 -21489 0
 21485  21486  21487  708  21490 0

c  -1-1 --> -2
c    ( b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧  b^{177, 4}_0 ∧ -p_708) -> ( b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0)
c  in CNF:
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨  b^{177, 5}_2
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨  b^{177, 5}_1
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨  p_708 ∨ -b^{177, 5}_0
c  in DIMACS:
-21485  21486 -21487  708  21488 0
-21485  21486 -21487  708  21489 0
-21485  21486 -21487  708 -21490 0

c  -2-1 --> break 
c    ( b^{177, 4}_2 ∧  b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨  b^{177, 4}_0 ∨  p_708 ∨ break
c  in DIMACS:
-21485 -21486  21487  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 4}_2 ∧ -b^{177, 4}_1 ∧ -b^{177, 4}_0 ∧ true) 
c  in CNF:
c    -b^{177, 4}_2 ∨  b^{177, 4}_1 ∨  b^{177, 4}_0 ∨ false 
c  in DIMACS:
-21485  21486  21487  0

c  3 does not represent an automaton state.
c    -(-b^{177, 4}_2 ∧  b^{177, 4}_1 ∧  b^{177, 4}_0 ∧ true) 
c  in CNF:
c     b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ false 
c  in DIMACS:
 21485 -21486 -21487  0
c  -3 does not represent an automaton state.
c    -( b^{177, 4}_2 ∧  b^{177, 4}_1 ∧  b^{177, 4}_0 ∧ true) 
c  in CNF:
c    -b^{177, 4}_2 ∨ -b^{177, 4}_1 ∨ -b^{177, 4}_0 ∨ false 
c  in DIMACS:
-21485 -21486 -21487  0

c i = 5
c  -2+1 --> -1
c    ( b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧  p_885) -> ( b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0)
c  in CNF:
c    -b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨  b^{177, 6}_2
c    -b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_1
c    -b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨  b^{177, 6}_0
c  in DIMACS:
-21488 -21489  21490 -885  21491 0
-21488 -21489  21490 -885 -21492 0
-21488 -21489  21490 -885  21493 0

c  -1+1 --> 0
c    ( b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0 ∧  p_885) -> (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧ -b^{177, 6}_0)
c  in CNF:
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_2
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_1
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_0
c  in DIMACS:
-21488  21489 -21490 -885 -21491 0
-21488  21489 -21490 -885 -21492 0
-21488  21489 -21490 -885 -21493 0

c  0+1 --> 1
c    (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧  p_885) -> (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0)
c  in CNF:
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_2
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_1
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨  b^{177, 6}_0
c  in DIMACS:
 21488  21489  21490 -885 -21491 0
 21488  21489  21490 -885 -21492 0
 21488  21489  21490 -885  21493 0

c  1+1 --> 2
c    (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0 ∧  p_885) -> (-b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0)
c  in CNF:
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_2
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨  b^{177, 6}_1
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ -p_885 ∨ -b^{177, 6}_0
c  in DIMACS:
 21488  21489 -21490 -885 -21491 0
 21488  21489 -21490 -885  21492 0
 21488  21489 -21490 -885 -21493 0

c  2+1 --> break 
c    (-b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧  p_885) -> break
c  in CNF:
c     b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 21488 -21489  21490 -885 1162 0


c  2-1 --> 1
c    (-b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧ -p_885) -> (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0)
c  in CNF:
c     b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_2
c     b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_1
c     b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨  b^{177, 6}_0
c  in DIMACS:
 21488 -21489  21490  885 -21491 0
 21488 -21489  21490  885 -21492 0
 21488 -21489  21490  885  21493 0

c  1-1 --> 0
c    (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0 ∧ -p_885) -> (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧ -b^{177, 6}_0)
c  in CNF:
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_2
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_1
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_0
c  in DIMACS:
 21488  21489 -21490  885 -21491 0
 21488  21489 -21490  885 -21492 0
 21488  21489 -21490  885 -21493 0

c  0-1 --> -1
c    (-b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧ -p_885) -> ( b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0)
c  in CNF:
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨  b^{177, 6}_2
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_1
c     b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨  b^{177, 6}_0
c  in DIMACS:
 21488  21489  21490  885  21491 0
 21488  21489  21490  885 -21492 0
 21488  21489  21490  885  21493 0

c  -1-1 --> -2
c    ( b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧  b^{177, 5}_0 ∧ -p_885) -> ( b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0)
c  in CNF:
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨  b^{177, 6}_2
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨  b^{177, 6}_1
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨  p_885 ∨ -b^{177, 6}_0
c  in DIMACS:
-21488  21489 -21490  885  21491 0
-21488  21489 -21490  885  21492 0
-21488  21489 -21490  885 -21493 0

c  -2-1 --> break 
c    ( b^{177, 5}_2 ∧  b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨  b^{177, 5}_0 ∨  p_885 ∨ break
c  in DIMACS:
-21488 -21489  21490  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 5}_2 ∧ -b^{177, 5}_1 ∧ -b^{177, 5}_0 ∧ true) 
c  in CNF:
c    -b^{177, 5}_2 ∨  b^{177, 5}_1 ∨  b^{177, 5}_0 ∨ false 
c  in DIMACS:
-21488  21489  21490  0

c  3 does not represent an automaton state.
c    -(-b^{177, 5}_2 ∧  b^{177, 5}_1 ∧  b^{177, 5}_0 ∧ true) 
c  in CNF:
c     b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ false 
c  in DIMACS:
 21488 -21489 -21490  0
c  -3 does not represent an automaton state.
c    -( b^{177, 5}_2 ∧  b^{177, 5}_1 ∧  b^{177, 5}_0 ∧ true) 
c  in CNF:
c    -b^{177, 5}_2 ∨ -b^{177, 5}_1 ∨ -b^{177, 5}_0 ∨ false 
c  in DIMACS:
-21488 -21489 -21490  0

c i = 6
c  -2+1 --> -1
c    ( b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧  p_1062) -> ( b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧  b^{177, 7}_0)
c  in CNF:
c    -b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨  b^{177, 7}_2
c    -b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_1
c    -b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨  b^{177, 7}_0
c  in DIMACS:
-21491 -21492  21493 -1062  21494 0
-21491 -21492  21493 -1062 -21495 0
-21491 -21492  21493 -1062  21496 0

c  -1+1 --> 0
c    ( b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0 ∧  p_1062) -> (-b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧ -b^{177, 7}_0)
c  in CNF:
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_2
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_1
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_0
c  in DIMACS:
-21491  21492 -21493 -1062 -21494 0
-21491  21492 -21493 -1062 -21495 0
-21491  21492 -21493 -1062 -21496 0

c  0+1 --> 1
c    (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧  p_1062) -> (-b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧  b^{177, 7}_0)
c  in CNF:
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_2
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_1
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨  b^{177, 7}_0
c  in DIMACS:
 21491  21492  21493 -1062 -21494 0
 21491  21492  21493 -1062 -21495 0
 21491  21492  21493 -1062  21496 0

c  1+1 --> 2
c    (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0 ∧  p_1062) -> (-b^{177, 7}_2 ∧  b^{177, 7}_1 ∧ -b^{177, 7}_0)
c  in CNF:
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_2
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨  b^{177, 7}_1
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ -p_1062 ∨ -b^{177, 7}_0
c  in DIMACS:
 21491  21492 -21493 -1062 -21494 0
 21491  21492 -21493 -1062  21495 0
 21491  21492 -21493 -1062 -21496 0

c  2+1 --> break 
c    (-b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 21491 -21492  21493 -1062 1162 0


c  2-1 --> 1
c    (-b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧ -p_1062) -> (-b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧  b^{177, 7}_0)
c  in CNF:
c     b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_2
c     b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_1
c     b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨  b^{177, 7}_0
c  in DIMACS:
 21491 -21492  21493  1062 -21494 0
 21491 -21492  21493  1062 -21495 0
 21491 -21492  21493  1062  21496 0

c  1-1 --> 0
c    (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0 ∧ -p_1062) -> (-b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧ -b^{177, 7}_0)
c  in CNF:
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_2
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_1
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_0
c  in DIMACS:
 21491  21492 -21493  1062 -21494 0
 21491  21492 -21493  1062 -21495 0
 21491  21492 -21493  1062 -21496 0

c  0-1 --> -1
c    (-b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧ -p_1062) -> ( b^{177, 7}_2 ∧ -b^{177, 7}_1 ∧  b^{177, 7}_0)
c  in CNF:
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨  b^{177, 7}_2
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_1
c     b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨  b^{177, 7}_0
c  in DIMACS:
 21491  21492  21493  1062  21494 0
 21491  21492  21493  1062 -21495 0
 21491  21492  21493  1062  21496 0

c  -1-1 --> -2
c    ( b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧  b^{177, 6}_0 ∧ -p_1062) -> ( b^{177, 7}_2 ∧  b^{177, 7}_1 ∧ -b^{177, 7}_0)
c  in CNF:
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨  b^{177, 7}_2
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨  b^{177, 7}_1
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨  p_1062 ∨ -b^{177, 7}_0
c  in DIMACS:
-21491  21492 -21493  1062  21494 0
-21491  21492 -21493  1062  21495 0
-21491  21492 -21493  1062 -21496 0

c  -2-1 --> break 
c    ( b^{177, 6}_2 ∧  b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨  b^{177, 6}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-21491 -21492  21493  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{177, 6}_2 ∧ -b^{177, 6}_1 ∧ -b^{177, 6}_0 ∧ true) 
c  in CNF:
c    -b^{177, 6}_2 ∨  b^{177, 6}_1 ∨  b^{177, 6}_0 ∨ false 
c  in DIMACS:
-21491  21492  21493  0

c  3 does not represent an automaton state.
c    -(-b^{177, 6}_2 ∧  b^{177, 6}_1 ∧  b^{177, 6}_0 ∧ true) 
c  in CNF:
c     b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ false 
c  in DIMACS:
 21491 -21492 -21493  0
c  -3 does not represent an automaton state.
c    -( b^{177, 6}_2 ∧  b^{177, 6}_1 ∧  b^{177, 6}_0 ∧ true) 
c  in CNF:
c    -b^{177, 6}_2 ∨ -b^{177, 6}_1 ∨ -b^{177, 6}_0 ∨ false 
c  in DIMACS:
-21491 -21492 -21493  0

c INIT for k = 178
c    -b^{178, 1}_2
c    -b^{178, 1}_1
c    -b^{178, 1}_0
c  in DIMACS:
-21497 0
-21498 0
-21499 0

c Transitions for k = 178
c i = 1
c  -2+1 --> -1
c    ( b^{178, 1}_2 ∧  b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧  p_178) -> ( b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0)
c  in CNF:
c    -b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨  b^{178, 2}_2
c    -b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_1
c    -b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨  b^{178, 2}_0
c  in DIMACS:
-21497 -21498  21499 -178  21500 0
-21497 -21498  21499 -178 -21501 0
-21497 -21498  21499 -178  21502 0

c  -1+1 --> 0
c    ( b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧  b^{178, 1}_0 ∧  p_178) -> (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧ -b^{178, 2}_0)
c  in CNF:
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_2
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_1
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_0
c  in DIMACS:
-21497  21498 -21499 -178 -21500 0
-21497  21498 -21499 -178 -21501 0
-21497  21498 -21499 -178 -21502 0

c  0+1 --> 1
c    (-b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧  p_178) -> (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0)
c  in CNF:
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_2
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_1
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨  b^{178, 2}_0
c  in DIMACS:
 21497  21498  21499 -178 -21500 0
 21497  21498  21499 -178 -21501 0
 21497  21498  21499 -178  21502 0

c  1+1 --> 2
c    (-b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧  b^{178, 1}_0 ∧  p_178) -> (-b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0)
c  in CNF:
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_2
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨  b^{178, 2}_1
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ -p_178 ∨ -b^{178, 2}_0
c  in DIMACS:
 21497  21498 -21499 -178 -21500 0
 21497  21498 -21499 -178  21501 0
 21497  21498 -21499 -178 -21502 0

c  2+1 --> break 
c    (-b^{178, 1}_2 ∧  b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧  p_178) -> break
c  in CNF:
c     b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ -p_178 ∨ break
c  in DIMACS:
 21497 -21498  21499 -178 1162 0


c  2-1 --> 1
c    (-b^{178, 1}_2 ∧  b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧ -p_178) -> (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0)
c  in CNF:
c     b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_2
c     b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_1
c     b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨  b^{178, 2}_0
c  in DIMACS:
 21497 -21498  21499  178 -21500 0
 21497 -21498  21499  178 -21501 0
 21497 -21498  21499  178  21502 0

c  1-1 --> 0
c    (-b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧  b^{178, 1}_0 ∧ -p_178) -> (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧ -b^{178, 2}_0)
c  in CNF:
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_2
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_1
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_0
c  in DIMACS:
 21497  21498 -21499  178 -21500 0
 21497  21498 -21499  178 -21501 0
 21497  21498 -21499  178 -21502 0

c  0-1 --> -1
c    (-b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧ -p_178) -> ( b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0)
c  in CNF:
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨  b^{178, 2}_2
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_1
c     b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨  b^{178, 2}_0
c  in DIMACS:
 21497  21498  21499  178  21500 0
 21497  21498  21499  178 -21501 0
 21497  21498  21499  178  21502 0

c  -1-1 --> -2
c    ( b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧  b^{178, 1}_0 ∧ -p_178) -> ( b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0)
c  in CNF:
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨  b^{178, 2}_2
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨  b^{178, 2}_1
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨  p_178 ∨ -b^{178, 2}_0
c  in DIMACS:
-21497  21498 -21499  178  21500 0
-21497  21498 -21499  178  21501 0
-21497  21498 -21499  178 -21502 0

c  -2-1 --> break 
c    ( b^{178, 1}_2 ∧  b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧ -p_178) -> break
c  in CNF:
c    -b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨  b^{178, 1}_0 ∨  p_178 ∨ break
c  in DIMACS:
-21497 -21498  21499  178 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 1}_2 ∧ -b^{178, 1}_1 ∧ -b^{178, 1}_0 ∧ true) 
c  in CNF:
c    -b^{178, 1}_2 ∨  b^{178, 1}_1 ∨  b^{178, 1}_0 ∨ false 
c  in DIMACS:
-21497  21498  21499  0

c  3 does not represent an automaton state.
c    -(-b^{178, 1}_2 ∧  b^{178, 1}_1 ∧  b^{178, 1}_0 ∧ true) 
c  in CNF:
c     b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ false 
c  in DIMACS:
 21497 -21498 -21499  0
c  -3 does not represent an automaton state.
c    -( b^{178, 1}_2 ∧  b^{178, 1}_1 ∧  b^{178, 1}_0 ∧ true) 
c  in CNF:
c    -b^{178, 1}_2 ∨ -b^{178, 1}_1 ∨ -b^{178, 1}_0 ∨ false 
c  in DIMACS:
-21497 -21498 -21499  0

c i = 2
c  -2+1 --> -1
c    ( b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧  p_356) -> ( b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0)
c  in CNF:
c    -b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨  b^{178, 3}_2
c    -b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_1
c    -b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨  b^{178, 3}_0
c  in DIMACS:
-21500 -21501  21502 -356  21503 0
-21500 -21501  21502 -356 -21504 0
-21500 -21501  21502 -356  21505 0

c  -1+1 --> 0
c    ( b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0 ∧  p_356) -> (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧ -b^{178, 3}_0)
c  in CNF:
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_2
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_1
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_0
c  in DIMACS:
-21500  21501 -21502 -356 -21503 0
-21500  21501 -21502 -356 -21504 0
-21500  21501 -21502 -356 -21505 0

c  0+1 --> 1
c    (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧  p_356) -> (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0)
c  in CNF:
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_2
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_1
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨  b^{178, 3}_0
c  in DIMACS:
 21500  21501  21502 -356 -21503 0
 21500  21501  21502 -356 -21504 0
 21500  21501  21502 -356  21505 0

c  1+1 --> 2
c    (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0 ∧  p_356) -> (-b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0)
c  in CNF:
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_2
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨  b^{178, 3}_1
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ -p_356 ∨ -b^{178, 3}_0
c  in DIMACS:
 21500  21501 -21502 -356 -21503 0
 21500  21501 -21502 -356  21504 0
 21500  21501 -21502 -356 -21505 0

c  2+1 --> break 
c    (-b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧  p_356) -> break
c  in CNF:
c     b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 21500 -21501  21502 -356 1162 0


c  2-1 --> 1
c    (-b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧ -p_356) -> (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0)
c  in CNF:
c     b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_2
c     b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_1
c     b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨  b^{178, 3}_0
c  in DIMACS:
 21500 -21501  21502  356 -21503 0
 21500 -21501  21502  356 -21504 0
 21500 -21501  21502  356  21505 0

c  1-1 --> 0
c    (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0 ∧ -p_356) -> (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧ -b^{178, 3}_0)
c  in CNF:
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_2
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_1
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_0
c  in DIMACS:
 21500  21501 -21502  356 -21503 0
 21500  21501 -21502  356 -21504 0
 21500  21501 -21502  356 -21505 0

c  0-1 --> -1
c    (-b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧ -p_356) -> ( b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0)
c  in CNF:
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨  b^{178, 3}_2
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_1
c     b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨  b^{178, 3}_0
c  in DIMACS:
 21500  21501  21502  356  21503 0
 21500  21501  21502  356 -21504 0
 21500  21501  21502  356  21505 0

c  -1-1 --> -2
c    ( b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧  b^{178, 2}_0 ∧ -p_356) -> ( b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0)
c  in CNF:
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨  b^{178, 3}_2
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨  b^{178, 3}_1
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨  p_356 ∨ -b^{178, 3}_0
c  in DIMACS:
-21500  21501 -21502  356  21503 0
-21500  21501 -21502  356  21504 0
-21500  21501 -21502  356 -21505 0

c  -2-1 --> break 
c    ( b^{178, 2}_2 ∧  b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨  b^{178, 2}_0 ∨  p_356 ∨ break
c  in DIMACS:
-21500 -21501  21502  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 2}_2 ∧ -b^{178, 2}_1 ∧ -b^{178, 2}_0 ∧ true) 
c  in CNF:
c    -b^{178, 2}_2 ∨  b^{178, 2}_1 ∨  b^{178, 2}_0 ∨ false 
c  in DIMACS:
-21500  21501  21502  0

c  3 does not represent an automaton state.
c    -(-b^{178, 2}_2 ∧  b^{178, 2}_1 ∧  b^{178, 2}_0 ∧ true) 
c  in CNF:
c     b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ false 
c  in DIMACS:
 21500 -21501 -21502  0
c  -3 does not represent an automaton state.
c    -( b^{178, 2}_2 ∧  b^{178, 2}_1 ∧  b^{178, 2}_0 ∧ true) 
c  in CNF:
c    -b^{178, 2}_2 ∨ -b^{178, 2}_1 ∨ -b^{178, 2}_0 ∨ false 
c  in DIMACS:
-21500 -21501 -21502  0

c i = 3
c  -2+1 --> -1
c    ( b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧  p_534) -> ( b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0)
c  in CNF:
c    -b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨  b^{178, 4}_2
c    -b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_1
c    -b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨  b^{178, 4}_0
c  in DIMACS:
-21503 -21504  21505 -534  21506 0
-21503 -21504  21505 -534 -21507 0
-21503 -21504  21505 -534  21508 0

c  -1+1 --> 0
c    ( b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0 ∧  p_534) -> (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧ -b^{178, 4}_0)
c  in CNF:
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_2
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_1
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_0
c  in DIMACS:
-21503  21504 -21505 -534 -21506 0
-21503  21504 -21505 -534 -21507 0
-21503  21504 -21505 -534 -21508 0

c  0+1 --> 1
c    (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧  p_534) -> (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0)
c  in CNF:
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_2
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_1
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨  b^{178, 4}_0
c  in DIMACS:
 21503  21504  21505 -534 -21506 0
 21503  21504  21505 -534 -21507 0
 21503  21504  21505 -534  21508 0

c  1+1 --> 2
c    (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0 ∧  p_534) -> (-b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0)
c  in CNF:
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_2
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨  b^{178, 4}_1
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ -p_534 ∨ -b^{178, 4}_0
c  in DIMACS:
 21503  21504 -21505 -534 -21506 0
 21503  21504 -21505 -534  21507 0
 21503  21504 -21505 -534 -21508 0

c  2+1 --> break 
c    (-b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧  p_534) -> break
c  in CNF:
c     b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 21503 -21504  21505 -534 1162 0


c  2-1 --> 1
c    (-b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧ -p_534) -> (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0)
c  in CNF:
c     b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_2
c     b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_1
c     b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨  b^{178, 4}_0
c  in DIMACS:
 21503 -21504  21505  534 -21506 0
 21503 -21504  21505  534 -21507 0
 21503 -21504  21505  534  21508 0

c  1-1 --> 0
c    (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0 ∧ -p_534) -> (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧ -b^{178, 4}_0)
c  in CNF:
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_2
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_1
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_0
c  in DIMACS:
 21503  21504 -21505  534 -21506 0
 21503  21504 -21505  534 -21507 0
 21503  21504 -21505  534 -21508 0

c  0-1 --> -1
c    (-b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧ -p_534) -> ( b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0)
c  in CNF:
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨  b^{178, 4}_2
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_1
c     b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨  b^{178, 4}_0
c  in DIMACS:
 21503  21504  21505  534  21506 0
 21503  21504  21505  534 -21507 0
 21503  21504  21505  534  21508 0

c  -1-1 --> -2
c    ( b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧  b^{178, 3}_0 ∧ -p_534) -> ( b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0)
c  in CNF:
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨  b^{178, 4}_2
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨  b^{178, 4}_1
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨  p_534 ∨ -b^{178, 4}_0
c  in DIMACS:
-21503  21504 -21505  534  21506 0
-21503  21504 -21505  534  21507 0
-21503  21504 -21505  534 -21508 0

c  -2-1 --> break 
c    ( b^{178, 3}_2 ∧  b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨  b^{178, 3}_0 ∨  p_534 ∨ break
c  in DIMACS:
-21503 -21504  21505  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 3}_2 ∧ -b^{178, 3}_1 ∧ -b^{178, 3}_0 ∧ true) 
c  in CNF:
c    -b^{178, 3}_2 ∨  b^{178, 3}_1 ∨  b^{178, 3}_0 ∨ false 
c  in DIMACS:
-21503  21504  21505  0

c  3 does not represent an automaton state.
c    -(-b^{178, 3}_2 ∧  b^{178, 3}_1 ∧  b^{178, 3}_0 ∧ true) 
c  in CNF:
c     b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ false 
c  in DIMACS:
 21503 -21504 -21505  0
c  -3 does not represent an automaton state.
c    -( b^{178, 3}_2 ∧  b^{178, 3}_1 ∧  b^{178, 3}_0 ∧ true) 
c  in CNF:
c    -b^{178, 3}_2 ∨ -b^{178, 3}_1 ∨ -b^{178, 3}_0 ∨ false 
c  in DIMACS:
-21503 -21504 -21505  0

c i = 4
c  -2+1 --> -1
c    ( b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧  p_712) -> ( b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0)
c  in CNF:
c    -b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨  b^{178, 5}_2
c    -b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_1
c    -b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨  b^{178, 5}_0
c  in DIMACS:
-21506 -21507  21508 -712  21509 0
-21506 -21507  21508 -712 -21510 0
-21506 -21507  21508 -712  21511 0

c  -1+1 --> 0
c    ( b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0 ∧  p_712) -> (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧ -b^{178, 5}_0)
c  in CNF:
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_2
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_1
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_0
c  in DIMACS:
-21506  21507 -21508 -712 -21509 0
-21506  21507 -21508 -712 -21510 0
-21506  21507 -21508 -712 -21511 0

c  0+1 --> 1
c    (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧  p_712) -> (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0)
c  in CNF:
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_2
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_1
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨  b^{178, 5}_0
c  in DIMACS:
 21506  21507  21508 -712 -21509 0
 21506  21507  21508 -712 -21510 0
 21506  21507  21508 -712  21511 0

c  1+1 --> 2
c    (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0 ∧  p_712) -> (-b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0)
c  in CNF:
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_2
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨  b^{178, 5}_1
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ -p_712 ∨ -b^{178, 5}_0
c  in DIMACS:
 21506  21507 -21508 -712 -21509 0
 21506  21507 -21508 -712  21510 0
 21506  21507 -21508 -712 -21511 0

c  2+1 --> break 
c    (-b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧  p_712) -> break
c  in CNF:
c     b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 21506 -21507  21508 -712 1162 0


c  2-1 --> 1
c    (-b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧ -p_712) -> (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0)
c  in CNF:
c     b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_2
c     b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_1
c     b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨  b^{178, 5}_0
c  in DIMACS:
 21506 -21507  21508  712 -21509 0
 21506 -21507  21508  712 -21510 0
 21506 -21507  21508  712  21511 0

c  1-1 --> 0
c    (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0 ∧ -p_712) -> (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧ -b^{178, 5}_0)
c  in CNF:
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_2
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_1
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_0
c  in DIMACS:
 21506  21507 -21508  712 -21509 0
 21506  21507 -21508  712 -21510 0
 21506  21507 -21508  712 -21511 0

c  0-1 --> -1
c    (-b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧ -p_712) -> ( b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0)
c  in CNF:
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨  b^{178, 5}_2
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_1
c     b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨  b^{178, 5}_0
c  in DIMACS:
 21506  21507  21508  712  21509 0
 21506  21507  21508  712 -21510 0
 21506  21507  21508  712  21511 0

c  -1-1 --> -2
c    ( b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧  b^{178, 4}_0 ∧ -p_712) -> ( b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0)
c  in CNF:
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨  b^{178, 5}_2
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨  b^{178, 5}_1
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨  p_712 ∨ -b^{178, 5}_0
c  in DIMACS:
-21506  21507 -21508  712  21509 0
-21506  21507 -21508  712  21510 0
-21506  21507 -21508  712 -21511 0

c  -2-1 --> break 
c    ( b^{178, 4}_2 ∧  b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨  b^{178, 4}_0 ∨  p_712 ∨ break
c  in DIMACS:
-21506 -21507  21508  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 4}_2 ∧ -b^{178, 4}_1 ∧ -b^{178, 4}_0 ∧ true) 
c  in CNF:
c    -b^{178, 4}_2 ∨  b^{178, 4}_1 ∨  b^{178, 4}_0 ∨ false 
c  in DIMACS:
-21506  21507  21508  0

c  3 does not represent an automaton state.
c    -(-b^{178, 4}_2 ∧  b^{178, 4}_1 ∧  b^{178, 4}_0 ∧ true) 
c  in CNF:
c     b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ false 
c  in DIMACS:
 21506 -21507 -21508  0
c  -3 does not represent an automaton state.
c    -( b^{178, 4}_2 ∧  b^{178, 4}_1 ∧  b^{178, 4}_0 ∧ true) 
c  in CNF:
c    -b^{178, 4}_2 ∨ -b^{178, 4}_1 ∨ -b^{178, 4}_0 ∨ false 
c  in DIMACS:
-21506 -21507 -21508  0

c i = 5
c  -2+1 --> -1
c    ( b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧  p_890) -> ( b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0)
c  in CNF:
c    -b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨  b^{178, 6}_2
c    -b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_1
c    -b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨  b^{178, 6}_0
c  in DIMACS:
-21509 -21510  21511 -890  21512 0
-21509 -21510  21511 -890 -21513 0
-21509 -21510  21511 -890  21514 0

c  -1+1 --> 0
c    ( b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0 ∧  p_890) -> (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧ -b^{178, 6}_0)
c  in CNF:
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_2
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_1
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_0
c  in DIMACS:
-21509  21510 -21511 -890 -21512 0
-21509  21510 -21511 -890 -21513 0
-21509  21510 -21511 -890 -21514 0

c  0+1 --> 1
c    (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧  p_890) -> (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0)
c  in CNF:
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_2
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_1
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨  b^{178, 6}_0
c  in DIMACS:
 21509  21510  21511 -890 -21512 0
 21509  21510  21511 -890 -21513 0
 21509  21510  21511 -890  21514 0

c  1+1 --> 2
c    (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0 ∧  p_890) -> (-b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0)
c  in CNF:
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_2
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨  b^{178, 6}_1
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ -p_890 ∨ -b^{178, 6}_0
c  in DIMACS:
 21509  21510 -21511 -890 -21512 0
 21509  21510 -21511 -890  21513 0
 21509  21510 -21511 -890 -21514 0

c  2+1 --> break 
c    (-b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧  p_890) -> break
c  in CNF:
c     b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ -p_890 ∨ break
c  in DIMACS:
 21509 -21510  21511 -890 1162 0


c  2-1 --> 1
c    (-b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧ -p_890) -> (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0)
c  in CNF:
c     b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_2
c     b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_1
c     b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨  b^{178, 6}_0
c  in DIMACS:
 21509 -21510  21511  890 -21512 0
 21509 -21510  21511  890 -21513 0
 21509 -21510  21511  890  21514 0

c  1-1 --> 0
c    (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0 ∧ -p_890) -> (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧ -b^{178, 6}_0)
c  in CNF:
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_2
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_1
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_0
c  in DIMACS:
 21509  21510 -21511  890 -21512 0
 21509  21510 -21511  890 -21513 0
 21509  21510 -21511  890 -21514 0

c  0-1 --> -1
c    (-b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧ -p_890) -> ( b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0)
c  in CNF:
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨  b^{178, 6}_2
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_1
c     b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨  b^{178, 6}_0
c  in DIMACS:
 21509  21510  21511  890  21512 0
 21509  21510  21511  890 -21513 0
 21509  21510  21511  890  21514 0

c  -1-1 --> -2
c    ( b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧  b^{178, 5}_0 ∧ -p_890) -> ( b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0)
c  in CNF:
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨  b^{178, 6}_2
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨  b^{178, 6}_1
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨  p_890 ∨ -b^{178, 6}_0
c  in DIMACS:
-21509  21510 -21511  890  21512 0
-21509  21510 -21511  890  21513 0
-21509  21510 -21511  890 -21514 0

c  -2-1 --> break 
c    ( b^{178, 5}_2 ∧  b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧ -p_890) -> break
c  in CNF:
c    -b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨  b^{178, 5}_0 ∨  p_890 ∨ break
c  in DIMACS:
-21509 -21510  21511  890 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 5}_2 ∧ -b^{178, 5}_1 ∧ -b^{178, 5}_0 ∧ true) 
c  in CNF:
c    -b^{178, 5}_2 ∨  b^{178, 5}_1 ∨  b^{178, 5}_0 ∨ false 
c  in DIMACS:
-21509  21510  21511  0

c  3 does not represent an automaton state.
c    -(-b^{178, 5}_2 ∧  b^{178, 5}_1 ∧  b^{178, 5}_0 ∧ true) 
c  in CNF:
c     b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ false 
c  in DIMACS:
 21509 -21510 -21511  0
c  -3 does not represent an automaton state.
c    -( b^{178, 5}_2 ∧  b^{178, 5}_1 ∧  b^{178, 5}_0 ∧ true) 
c  in CNF:
c    -b^{178, 5}_2 ∨ -b^{178, 5}_1 ∨ -b^{178, 5}_0 ∨ false 
c  in DIMACS:
-21509 -21510 -21511  0

c i = 6
c  -2+1 --> -1
c    ( b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧  p_1068) -> ( b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧  b^{178, 7}_0)
c  in CNF:
c    -b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨  b^{178, 7}_2
c    -b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_1
c    -b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨  b^{178, 7}_0
c  in DIMACS:
-21512 -21513  21514 -1068  21515 0
-21512 -21513  21514 -1068 -21516 0
-21512 -21513  21514 -1068  21517 0

c  -1+1 --> 0
c    ( b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0 ∧  p_1068) -> (-b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧ -b^{178, 7}_0)
c  in CNF:
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_2
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_1
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_0
c  in DIMACS:
-21512  21513 -21514 -1068 -21515 0
-21512  21513 -21514 -1068 -21516 0
-21512  21513 -21514 -1068 -21517 0

c  0+1 --> 1
c    (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧  p_1068) -> (-b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧  b^{178, 7}_0)
c  in CNF:
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_2
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_1
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨  b^{178, 7}_0
c  in DIMACS:
 21512  21513  21514 -1068 -21515 0
 21512  21513  21514 -1068 -21516 0
 21512  21513  21514 -1068  21517 0

c  1+1 --> 2
c    (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0 ∧  p_1068) -> (-b^{178, 7}_2 ∧  b^{178, 7}_1 ∧ -b^{178, 7}_0)
c  in CNF:
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_2
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨  b^{178, 7}_1
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ -p_1068 ∨ -b^{178, 7}_0
c  in DIMACS:
 21512  21513 -21514 -1068 -21515 0
 21512  21513 -21514 -1068  21516 0
 21512  21513 -21514 -1068 -21517 0

c  2+1 --> break 
c    (-b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 21512 -21513  21514 -1068 1162 0


c  2-1 --> 1
c    (-b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧ -p_1068) -> (-b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧  b^{178, 7}_0)
c  in CNF:
c     b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_2
c     b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_1
c     b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨  b^{178, 7}_0
c  in DIMACS:
 21512 -21513  21514  1068 -21515 0
 21512 -21513  21514  1068 -21516 0
 21512 -21513  21514  1068  21517 0

c  1-1 --> 0
c    (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0 ∧ -p_1068) -> (-b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧ -b^{178, 7}_0)
c  in CNF:
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_2
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_1
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_0
c  in DIMACS:
 21512  21513 -21514  1068 -21515 0
 21512  21513 -21514  1068 -21516 0
 21512  21513 -21514  1068 -21517 0

c  0-1 --> -1
c    (-b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧ -p_1068) -> ( b^{178, 7}_2 ∧ -b^{178, 7}_1 ∧  b^{178, 7}_0)
c  in CNF:
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨  b^{178, 7}_2
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_1
c     b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨  b^{178, 7}_0
c  in DIMACS:
 21512  21513  21514  1068  21515 0
 21512  21513  21514  1068 -21516 0
 21512  21513  21514  1068  21517 0

c  -1-1 --> -2
c    ( b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧  b^{178, 6}_0 ∧ -p_1068) -> ( b^{178, 7}_2 ∧  b^{178, 7}_1 ∧ -b^{178, 7}_0)
c  in CNF:
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨  b^{178, 7}_2
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨  b^{178, 7}_1
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨  p_1068 ∨ -b^{178, 7}_0
c  in DIMACS:
-21512  21513 -21514  1068  21515 0
-21512  21513 -21514  1068  21516 0
-21512  21513 -21514  1068 -21517 0

c  -2-1 --> break 
c    ( b^{178, 6}_2 ∧  b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨  b^{178, 6}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-21512 -21513  21514  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{178, 6}_2 ∧ -b^{178, 6}_1 ∧ -b^{178, 6}_0 ∧ true) 
c  in CNF:
c    -b^{178, 6}_2 ∨  b^{178, 6}_1 ∨  b^{178, 6}_0 ∨ false 
c  in DIMACS:
-21512  21513  21514  0

c  3 does not represent an automaton state.
c    -(-b^{178, 6}_2 ∧  b^{178, 6}_1 ∧  b^{178, 6}_0 ∧ true) 
c  in CNF:
c     b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ false 
c  in DIMACS:
 21512 -21513 -21514  0
c  -3 does not represent an automaton state.
c    -( b^{178, 6}_2 ∧  b^{178, 6}_1 ∧  b^{178, 6}_0 ∧ true) 
c  in CNF:
c    -b^{178, 6}_2 ∨ -b^{178, 6}_1 ∨ -b^{178, 6}_0 ∨ false 
c  in DIMACS:
-21512 -21513 -21514  0

c INIT for k = 179
c    -b^{179, 1}_2
c    -b^{179, 1}_1
c    -b^{179, 1}_0
c  in DIMACS:
-21518 0
-21519 0
-21520 0

c Transitions for k = 179
c i = 1
c  -2+1 --> -1
c    ( b^{179, 1}_2 ∧  b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧  p_179) -> ( b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0)
c  in CNF:
c    -b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨  b^{179, 2}_2
c    -b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_1
c    -b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨  b^{179, 2}_0
c  in DIMACS:
-21518 -21519  21520 -179  21521 0
-21518 -21519  21520 -179 -21522 0
-21518 -21519  21520 -179  21523 0

c  -1+1 --> 0
c    ( b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧  b^{179, 1}_0 ∧  p_179) -> (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧ -b^{179, 2}_0)
c  in CNF:
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_2
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_1
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_0
c  in DIMACS:
-21518  21519 -21520 -179 -21521 0
-21518  21519 -21520 -179 -21522 0
-21518  21519 -21520 -179 -21523 0

c  0+1 --> 1
c    (-b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧  p_179) -> (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0)
c  in CNF:
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_2
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_1
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨  b^{179, 2}_0
c  in DIMACS:
 21518  21519  21520 -179 -21521 0
 21518  21519  21520 -179 -21522 0
 21518  21519  21520 -179  21523 0

c  1+1 --> 2
c    (-b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧  b^{179, 1}_0 ∧  p_179) -> (-b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0)
c  in CNF:
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_2
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨  b^{179, 2}_1
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ -p_179 ∨ -b^{179, 2}_0
c  in DIMACS:
 21518  21519 -21520 -179 -21521 0
 21518  21519 -21520 -179  21522 0
 21518  21519 -21520 -179 -21523 0

c  2+1 --> break 
c    (-b^{179, 1}_2 ∧  b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧  p_179) -> break
c  in CNF:
c     b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ -p_179 ∨ break
c  in DIMACS:
 21518 -21519  21520 -179 1162 0


c  2-1 --> 1
c    (-b^{179, 1}_2 ∧  b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧ -p_179) -> (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0)
c  in CNF:
c     b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_2
c     b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_1
c     b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨  b^{179, 2}_0
c  in DIMACS:
 21518 -21519  21520  179 -21521 0
 21518 -21519  21520  179 -21522 0
 21518 -21519  21520  179  21523 0

c  1-1 --> 0
c    (-b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧  b^{179, 1}_0 ∧ -p_179) -> (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧ -b^{179, 2}_0)
c  in CNF:
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_2
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_1
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_0
c  in DIMACS:
 21518  21519 -21520  179 -21521 0
 21518  21519 -21520  179 -21522 0
 21518  21519 -21520  179 -21523 0

c  0-1 --> -1
c    (-b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧ -p_179) -> ( b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0)
c  in CNF:
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨  b^{179, 2}_2
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_1
c     b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨  b^{179, 2}_0
c  in DIMACS:
 21518  21519  21520  179  21521 0
 21518  21519  21520  179 -21522 0
 21518  21519  21520  179  21523 0

c  -1-1 --> -2
c    ( b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧  b^{179, 1}_0 ∧ -p_179) -> ( b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0)
c  in CNF:
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨  b^{179, 2}_2
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨  b^{179, 2}_1
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨  p_179 ∨ -b^{179, 2}_0
c  in DIMACS:
-21518  21519 -21520  179  21521 0
-21518  21519 -21520  179  21522 0
-21518  21519 -21520  179 -21523 0

c  -2-1 --> break 
c    ( b^{179, 1}_2 ∧  b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧ -p_179) -> break
c  in CNF:
c    -b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨  b^{179, 1}_0 ∨  p_179 ∨ break
c  in DIMACS:
-21518 -21519  21520  179 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 1}_2 ∧ -b^{179, 1}_1 ∧ -b^{179, 1}_0 ∧ true) 
c  in CNF:
c    -b^{179, 1}_2 ∨  b^{179, 1}_1 ∨  b^{179, 1}_0 ∨ false 
c  in DIMACS:
-21518  21519  21520  0

c  3 does not represent an automaton state.
c    -(-b^{179, 1}_2 ∧  b^{179, 1}_1 ∧  b^{179, 1}_0 ∧ true) 
c  in CNF:
c     b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ false 
c  in DIMACS:
 21518 -21519 -21520  0
c  -3 does not represent an automaton state.
c    -( b^{179, 1}_2 ∧  b^{179, 1}_1 ∧  b^{179, 1}_0 ∧ true) 
c  in CNF:
c    -b^{179, 1}_2 ∨ -b^{179, 1}_1 ∨ -b^{179, 1}_0 ∨ false 
c  in DIMACS:
-21518 -21519 -21520  0

c i = 2
c  -2+1 --> -1
c    ( b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧  p_358) -> ( b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0)
c  in CNF:
c    -b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨  b^{179, 3}_2
c    -b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_1
c    -b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨  b^{179, 3}_0
c  in DIMACS:
-21521 -21522  21523 -358  21524 0
-21521 -21522  21523 -358 -21525 0
-21521 -21522  21523 -358  21526 0

c  -1+1 --> 0
c    ( b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0 ∧  p_358) -> (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧ -b^{179, 3}_0)
c  in CNF:
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_2
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_1
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_0
c  in DIMACS:
-21521  21522 -21523 -358 -21524 0
-21521  21522 -21523 -358 -21525 0
-21521  21522 -21523 -358 -21526 0

c  0+1 --> 1
c    (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧  p_358) -> (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0)
c  in CNF:
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_2
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_1
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨  b^{179, 3}_0
c  in DIMACS:
 21521  21522  21523 -358 -21524 0
 21521  21522  21523 -358 -21525 0
 21521  21522  21523 -358  21526 0

c  1+1 --> 2
c    (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0 ∧  p_358) -> (-b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0)
c  in CNF:
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_2
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨  b^{179, 3}_1
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ -p_358 ∨ -b^{179, 3}_0
c  in DIMACS:
 21521  21522 -21523 -358 -21524 0
 21521  21522 -21523 -358  21525 0
 21521  21522 -21523 -358 -21526 0

c  2+1 --> break 
c    (-b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧  p_358) -> break
c  in CNF:
c     b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ -p_358 ∨ break
c  in DIMACS:
 21521 -21522  21523 -358 1162 0


c  2-1 --> 1
c    (-b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧ -p_358) -> (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0)
c  in CNF:
c     b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_2
c     b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_1
c     b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨  b^{179, 3}_0
c  in DIMACS:
 21521 -21522  21523  358 -21524 0
 21521 -21522  21523  358 -21525 0
 21521 -21522  21523  358  21526 0

c  1-1 --> 0
c    (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0 ∧ -p_358) -> (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧ -b^{179, 3}_0)
c  in CNF:
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_2
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_1
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_0
c  in DIMACS:
 21521  21522 -21523  358 -21524 0
 21521  21522 -21523  358 -21525 0
 21521  21522 -21523  358 -21526 0

c  0-1 --> -1
c    (-b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧ -p_358) -> ( b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0)
c  in CNF:
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨  b^{179, 3}_2
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_1
c     b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨  b^{179, 3}_0
c  in DIMACS:
 21521  21522  21523  358  21524 0
 21521  21522  21523  358 -21525 0
 21521  21522  21523  358  21526 0

c  -1-1 --> -2
c    ( b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧  b^{179, 2}_0 ∧ -p_358) -> ( b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0)
c  in CNF:
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨  b^{179, 3}_2
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨  b^{179, 3}_1
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨  p_358 ∨ -b^{179, 3}_0
c  in DIMACS:
-21521  21522 -21523  358  21524 0
-21521  21522 -21523  358  21525 0
-21521  21522 -21523  358 -21526 0

c  -2-1 --> break 
c    ( b^{179, 2}_2 ∧  b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧ -p_358) -> break
c  in CNF:
c    -b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨  b^{179, 2}_0 ∨  p_358 ∨ break
c  in DIMACS:
-21521 -21522  21523  358 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 2}_2 ∧ -b^{179, 2}_1 ∧ -b^{179, 2}_0 ∧ true) 
c  in CNF:
c    -b^{179, 2}_2 ∨  b^{179, 2}_1 ∨  b^{179, 2}_0 ∨ false 
c  in DIMACS:
-21521  21522  21523  0

c  3 does not represent an automaton state.
c    -(-b^{179, 2}_2 ∧  b^{179, 2}_1 ∧  b^{179, 2}_0 ∧ true) 
c  in CNF:
c     b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ false 
c  in DIMACS:
 21521 -21522 -21523  0
c  -3 does not represent an automaton state.
c    -( b^{179, 2}_2 ∧  b^{179, 2}_1 ∧  b^{179, 2}_0 ∧ true) 
c  in CNF:
c    -b^{179, 2}_2 ∨ -b^{179, 2}_1 ∨ -b^{179, 2}_0 ∨ false 
c  in DIMACS:
-21521 -21522 -21523  0

c i = 3
c  -2+1 --> -1
c    ( b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧  p_537) -> ( b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0)
c  in CNF:
c    -b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨  b^{179, 4}_2
c    -b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_1
c    -b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨  b^{179, 4}_0
c  in DIMACS:
-21524 -21525  21526 -537  21527 0
-21524 -21525  21526 -537 -21528 0
-21524 -21525  21526 -537  21529 0

c  -1+1 --> 0
c    ( b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0 ∧  p_537) -> (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧ -b^{179, 4}_0)
c  in CNF:
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_2
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_1
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_0
c  in DIMACS:
-21524  21525 -21526 -537 -21527 0
-21524  21525 -21526 -537 -21528 0
-21524  21525 -21526 -537 -21529 0

c  0+1 --> 1
c    (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧  p_537) -> (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0)
c  in CNF:
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_2
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_1
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨  b^{179, 4}_0
c  in DIMACS:
 21524  21525  21526 -537 -21527 0
 21524  21525  21526 -537 -21528 0
 21524  21525  21526 -537  21529 0

c  1+1 --> 2
c    (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0 ∧  p_537) -> (-b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0)
c  in CNF:
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_2
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨  b^{179, 4}_1
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ -p_537 ∨ -b^{179, 4}_0
c  in DIMACS:
 21524  21525 -21526 -537 -21527 0
 21524  21525 -21526 -537  21528 0
 21524  21525 -21526 -537 -21529 0

c  2+1 --> break 
c    (-b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧  p_537) -> break
c  in CNF:
c     b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ -p_537 ∨ break
c  in DIMACS:
 21524 -21525  21526 -537 1162 0


c  2-1 --> 1
c    (-b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧ -p_537) -> (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0)
c  in CNF:
c     b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_2
c     b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_1
c     b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨  b^{179, 4}_0
c  in DIMACS:
 21524 -21525  21526  537 -21527 0
 21524 -21525  21526  537 -21528 0
 21524 -21525  21526  537  21529 0

c  1-1 --> 0
c    (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0 ∧ -p_537) -> (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧ -b^{179, 4}_0)
c  in CNF:
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_2
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_1
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_0
c  in DIMACS:
 21524  21525 -21526  537 -21527 0
 21524  21525 -21526  537 -21528 0
 21524  21525 -21526  537 -21529 0

c  0-1 --> -1
c    (-b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧ -p_537) -> ( b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0)
c  in CNF:
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨  b^{179, 4}_2
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_1
c     b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨  b^{179, 4}_0
c  in DIMACS:
 21524  21525  21526  537  21527 0
 21524  21525  21526  537 -21528 0
 21524  21525  21526  537  21529 0

c  -1-1 --> -2
c    ( b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧  b^{179, 3}_0 ∧ -p_537) -> ( b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0)
c  in CNF:
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨  b^{179, 4}_2
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨  b^{179, 4}_1
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨  p_537 ∨ -b^{179, 4}_0
c  in DIMACS:
-21524  21525 -21526  537  21527 0
-21524  21525 -21526  537  21528 0
-21524  21525 -21526  537 -21529 0

c  -2-1 --> break 
c    ( b^{179, 3}_2 ∧  b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧ -p_537) -> break
c  in CNF:
c    -b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨  b^{179, 3}_0 ∨  p_537 ∨ break
c  in DIMACS:
-21524 -21525  21526  537 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 3}_2 ∧ -b^{179, 3}_1 ∧ -b^{179, 3}_0 ∧ true) 
c  in CNF:
c    -b^{179, 3}_2 ∨  b^{179, 3}_1 ∨  b^{179, 3}_0 ∨ false 
c  in DIMACS:
-21524  21525  21526  0

c  3 does not represent an automaton state.
c    -(-b^{179, 3}_2 ∧  b^{179, 3}_1 ∧  b^{179, 3}_0 ∧ true) 
c  in CNF:
c     b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ false 
c  in DIMACS:
 21524 -21525 -21526  0
c  -3 does not represent an automaton state.
c    -( b^{179, 3}_2 ∧  b^{179, 3}_1 ∧  b^{179, 3}_0 ∧ true) 
c  in CNF:
c    -b^{179, 3}_2 ∨ -b^{179, 3}_1 ∨ -b^{179, 3}_0 ∨ false 
c  in DIMACS:
-21524 -21525 -21526  0

c i = 4
c  -2+1 --> -1
c    ( b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧  p_716) -> ( b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0)
c  in CNF:
c    -b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨  b^{179, 5}_2
c    -b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_1
c    -b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨  b^{179, 5}_0
c  in DIMACS:
-21527 -21528  21529 -716  21530 0
-21527 -21528  21529 -716 -21531 0
-21527 -21528  21529 -716  21532 0

c  -1+1 --> 0
c    ( b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0 ∧  p_716) -> (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧ -b^{179, 5}_0)
c  in CNF:
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_2
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_1
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_0
c  in DIMACS:
-21527  21528 -21529 -716 -21530 0
-21527  21528 -21529 -716 -21531 0
-21527  21528 -21529 -716 -21532 0

c  0+1 --> 1
c    (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧  p_716) -> (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0)
c  in CNF:
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_2
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_1
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨  b^{179, 5}_0
c  in DIMACS:
 21527  21528  21529 -716 -21530 0
 21527  21528  21529 -716 -21531 0
 21527  21528  21529 -716  21532 0

c  1+1 --> 2
c    (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0 ∧  p_716) -> (-b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0)
c  in CNF:
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_2
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨  b^{179, 5}_1
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ -p_716 ∨ -b^{179, 5}_0
c  in DIMACS:
 21527  21528 -21529 -716 -21530 0
 21527  21528 -21529 -716  21531 0
 21527  21528 -21529 -716 -21532 0

c  2+1 --> break 
c    (-b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧  p_716) -> break
c  in CNF:
c     b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ -p_716 ∨ break
c  in DIMACS:
 21527 -21528  21529 -716 1162 0


c  2-1 --> 1
c    (-b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧ -p_716) -> (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0)
c  in CNF:
c     b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_2
c     b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_1
c     b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨  b^{179, 5}_0
c  in DIMACS:
 21527 -21528  21529  716 -21530 0
 21527 -21528  21529  716 -21531 0
 21527 -21528  21529  716  21532 0

c  1-1 --> 0
c    (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0 ∧ -p_716) -> (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧ -b^{179, 5}_0)
c  in CNF:
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_2
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_1
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_0
c  in DIMACS:
 21527  21528 -21529  716 -21530 0
 21527  21528 -21529  716 -21531 0
 21527  21528 -21529  716 -21532 0

c  0-1 --> -1
c    (-b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧ -p_716) -> ( b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0)
c  in CNF:
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨  b^{179, 5}_2
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_1
c     b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨  b^{179, 5}_0
c  in DIMACS:
 21527  21528  21529  716  21530 0
 21527  21528  21529  716 -21531 0
 21527  21528  21529  716  21532 0

c  -1-1 --> -2
c    ( b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧  b^{179, 4}_0 ∧ -p_716) -> ( b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0)
c  in CNF:
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨  b^{179, 5}_2
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨  b^{179, 5}_1
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨  p_716 ∨ -b^{179, 5}_0
c  in DIMACS:
-21527  21528 -21529  716  21530 0
-21527  21528 -21529  716  21531 0
-21527  21528 -21529  716 -21532 0

c  -2-1 --> break 
c    ( b^{179, 4}_2 ∧  b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧ -p_716) -> break
c  in CNF:
c    -b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨  b^{179, 4}_0 ∨  p_716 ∨ break
c  in DIMACS:
-21527 -21528  21529  716 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 4}_2 ∧ -b^{179, 4}_1 ∧ -b^{179, 4}_0 ∧ true) 
c  in CNF:
c    -b^{179, 4}_2 ∨  b^{179, 4}_1 ∨  b^{179, 4}_0 ∨ false 
c  in DIMACS:
-21527  21528  21529  0

c  3 does not represent an automaton state.
c    -(-b^{179, 4}_2 ∧  b^{179, 4}_1 ∧  b^{179, 4}_0 ∧ true) 
c  in CNF:
c     b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ false 
c  in DIMACS:
 21527 -21528 -21529  0
c  -3 does not represent an automaton state.
c    -( b^{179, 4}_2 ∧  b^{179, 4}_1 ∧  b^{179, 4}_0 ∧ true) 
c  in CNF:
c    -b^{179, 4}_2 ∨ -b^{179, 4}_1 ∨ -b^{179, 4}_0 ∨ false 
c  in DIMACS:
-21527 -21528 -21529  0

c i = 5
c  -2+1 --> -1
c    ( b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧  p_895) -> ( b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0)
c  in CNF:
c    -b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨  b^{179, 6}_2
c    -b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_1
c    -b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨  b^{179, 6}_0
c  in DIMACS:
-21530 -21531  21532 -895  21533 0
-21530 -21531  21532 -895 -21534 0
-21530 -21531  21532 -895  21535 0

c  -1+1 --> 0
c    ( b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0 ∧  p_895) -> (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧ -b^{179, 6}_0)
c  in CNF:
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_2
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_1
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_0
c  in DIMACS:
-21530  21531 -21532 -895 -21533 0
-21530  21531 -21532 -895 -21534 0
-21530  21531 -21532 -895 -21535 0

c  0+1 --> 1
c    (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧  p_895) -> (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0)
c  in CNF:
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_2
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_1
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨  b^{179, 6}_0
c  in DIMACS:
 21530  21531  21532 -895 -21533 0
 21530  21531  21532 -895 -21534 0
 21530  21531  21532 -895  21535 0

c  1+1 --> 2
c    (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0 ∧  p_895) -> (-b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0)
c  in CNF:
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_2
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨  b^{179, 6}_1
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ -p_895 ∨ -b^{179, 6}_0
c  in DIMACS:
 21530  21531 -21532 -895 -21533 0
 21530  21531 -21532 -895  21534 0
 21530  21531 -21532 -895 -21535 0

c  2+1 --> break 
c    (-b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧  p_895) -> break
c  in CNF:
c     b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ -p_895 ∨ break
c  in DIMACS:
 21530 -21531  21532 -895 1162 0


c  2-1 --> 1
c    (-b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧ -p_895) -> (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0)
c  in CNF:
c     b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_2
c     b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_1
c     b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨  b^{179, 6}_0
c  in DIMACS:
 21530 -21531  21532  895 -21533 0
 21530 -21531  21532  895 -21534 0
 21530 -21531  21532  895  21535 0

c  1-1 --> 0
c    (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0 ∧ -p_895) -> (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧ -b^{179, 6}_0)
c  in CNF:
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_2
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_1
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_0
c  in DIMACS:
 21530  21531 -21532  895 -21533 0
 21530  21531 -21532  895 -21534 0
 21530  21531 -21532  895 -21535 0

c  0-1 --> -1
c    (-b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧ -p_895) -> ( b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0)
c  in CNF:
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨  b^{179, 6}_2
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_1
c     b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨  b^{179, 6}_0
c  in DIMACS:
 21530  21531  21532  895  21533 0
 21530  21531  21532  895 -21534 0
 21530  21531  21532  895  21535 0

c  -1-1 --> -2
c    ( b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧  b^{179, 5}_0 ∧ -p_895) -> ( b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0)
c  in CNF:
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨  b^{179, 6}_2
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨  b^{179, 6}_1
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨  p_895 ∨ -b^{179, 6}_0
c  in DIMACS:
-21530  21531 -21532  895  21533 0
-21530  21531 -21532  895  21534 0
-21530  21531 -21532  895 -21535 0

c  -2-1 --> break 
c    ( b^{179, 5}_2 ∧  b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧ -p_895) -> break
c  in CNF:
c    -b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨  b^{179, 5}_0 ∨  p_895 ∨ break
c  in DIMACS:
-21530 -21531  21532  895 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 5}_2 ∧ -b^{179, 5}_1 ∧ -b^{179, 5}_0 ∧ true) 
c  in CNF:
c    -b^{179, 5}_2 ∨  b^{179, 5}_1 ∨  b^{179, 5}_0 ∨ false 
c  in DIMACS:
-21530  21531  21532  0

c  3 does not represent an automaton state.
c    -(-b^{179, 5}_2 ∧  b^{179, 5}_1 ∧  b^{179, 5}_0 ∧ true) 
c  in CNF:
c     b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ false 
c  in DIMACS:
 21530 -21531 -21532  0
c  -3 does not represent an automaton state.
c    -( b^{179, 5}_2 ∧  b^{179, 5}_1 ∧  b^{179, 5}_0 ∧ true) 
c  in CNF:
c    -b^{179, 5}_2 ∨ -b^{179, 5}_1 ∨ -b^{179, 5}_0 ∨ false 
c  in DIMACS:
-21530 -21531 -21532  0

c i = 6
c  -2+1 --> -1
c    ( b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧  p_1074) -> ( b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧  b^{179, 7}_0)
c  in CNF:
c    -b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨  b^{179, 7}_2
c    -b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_1
c    -b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨  b^{179, 7}_0
c  in DIMACS:
-21533 -21534  21535 -1074  21536 0
-21533 -21534  21535 -1074 -21537 0
-21533 -21534  21535 -1074  21538 0

c  -1+1 --> 0
c    ( b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0 ∧  p_1074) -> (-b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧ -b^{179, 7}_0)
c  in CNF:
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_2
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_1
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_0
c  in DIMACS:
-21533  21534 -21535 -1074 -21536 0
-21533  21534 -21535 -1074 -21537 0
-21533  21534 -21535 -1074 -21538 0

c  0+1 --> 1
c    (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧  p_1074) -> (-b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧  b^{179, 7}_0)
c  in CNF:
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_2
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_1
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨  b^{179, 7}_0
c  in DIMACS:
 21533  21534  21535 -1074 -21536 0
 21533  21534  21535 -1074 -21537 0
 21533  21534  21535 -1074  21538 0

c  1+1 --> 2
c    (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0 ∧  p_1074) -> (-b^{179, 7}_2 ∧  b^{179, 7}_1 ∧ -b^{179, 7}_0)
c  in CNF:
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_2
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨  b^{179, 7}_1
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ -p_1074 ∨ -b^{179, 7}_0
c  in DIMACS:
 21533  21534 -21535 -1074 -21536 0
 21533  21534 -21535 -1074  21537 0
 21533  21534 -21535 -1074 -21538 0

c  2+1 --> break 
c    (-b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 21533 -21534  21535 -1074 1162 0


c  2-1 --> 1
c    (-b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧ -p_1074) -> (-b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧  b^{179, 7}_0)
c  in CNF:
c     b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_2
c     b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_1
c     b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨  b^{179, 7}_0
c  in DIMACS:
 21533 -21534  21535  1074 -21536 0
 21533 -21534  21535  1074 -21537 0
 21533 -21534  21535  1074  21538 0

c  1-1 --> 0
c    (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0 ∧ -p_1074) -> (-b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧ -b^{179, 7}_0)
c  in CNF:
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_2
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_1
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_0
c  in DIMACS:
 21533  21534 -21535  1074 -21536 0
 21533  21534 -21535  1074 -21537 0
 21533  21534 -21535  1074 -21538 0

c  0-1 --> -1
c    (-b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧ -p_1074) -> ( b^{179, 7}_2 ∧ -b^{179, 7}_1 ∧  b^{179, 7}_0)
c  in CNF:
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨  b^{179, 7}_2
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_1
c     b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨  b^{179, 7}_0
c  in DIMACS:
 21533  21534  21535  1074  21536 0
 21533  21534  21535  1074 -21537 0
 21533  21534  21535  1074  21538 0

c  -1-1 --> -2
c    ( b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧  b^{179, 6}_0 ∧ -p_1074) -> ( b^{179, 7}_2 ∧  b^{179, 7}_1 ∧ -b^{179, 7}_0)
c  in CNF:
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨  b^{179, 7}_2
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨  b^{179, 7}_1
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨  p_1074 ∨ -b^{179, 7}_0
c  in DIMACS:
-21533  21534 -21535  1074  21536 0
-21533  21534 -21535  1074  21537 0
-21533  21534 -21535  1074 -21538 0

c  -2-1 --> break 
c    ( b^{179, 6}_2 ∧  b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨  b^{179, 6}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-21533 -21534  21535  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{179, 6}_2 ∧ -b^{179, 6}_1 ∧ -b^{179, 6}_0 ∧ true) 
c  in CNF:
c    -b^{179, 6}_2 ∨  b^{179, 6}_1 ∨  b^{179, 6}_0 ∨ false 
c  in DIMACS:
-21533  21534  21535  0

c  3 does not represent an automaton state.
c    -(-b^{179, 6}_2 ∧  b^{179, 6}_1 ∧  b^{179, 6}_0 ∧ true) 
c  in CNF:
c     b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ false 
c  in DIMACS:
 21533 -21534 -21535  0
c  -3 does not represent an automaton state.
c    -( b^{179, 6}_2 ∧  b^{179, 6}_1 ∧  b^{179, 6}_0 ∧ true) 
c  in CNF:
c    -b^{179, 6}_2 ∨ -b^{179, 6}_1 ∨ -b^{179, 6}_0 ∨ false 
c  in DIMACS:
-21533 -21534 -21535  0

c INIT for k = 180
c    -b^{180, 1}_2
c    -b^{180, 1}_1
c    -b^{180, 1}_0
c  in DIMACS:
-21539 0
-21540 0
-21541 0

c Transitions for k = 180
c i = 1
c  -2+1 --> -1
c    ( b^{180, 1}_2 ∧  b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧  p_180) -> ( b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0)
c  in CNF:
c    -b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨  b^{180, 2}_2
c    -b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_1
c    -b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨  b^{180, 2}_0
c  in DIMACS:
-21539 -21540  21541 -180  21542 0
-21539 -21540  21541 -180 -21543 0
-21539 -21540  21541 -180  21544 0

c  -1+1 --> 0
c    ( b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧  b^{180, 1}_0 ∧  p_180) -> (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧ -b^{180, 2}_0)
c  in CNF:
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_2
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_1
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_0
c  in DIMACS:
-21539  21540 -21541 -180 -21542 0
-21539  21540 -21541 -180 -21543 0
-21539  21540 -21541 -180 -21544 0

c  0+1 --> 1
c    (-b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧  p_180) -> (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0)
c  in CNF:
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_2
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_1
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨  b^{180, 2}_0
c  in DIMACS:
 21539  21540  21541 -180 -21542 0
 21539  21540  21541 -180 -21543 0
 21539  21540  21541 -180  21544 0

c  1+1 --> 2
c    (-b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧  b^{180, 1}_0 ∧  p_180) -> (-b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0)
c  in CNF:
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_2
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨  b^{180, 2}_1
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ -p_180 ∨ -b^{180, 2}_0
c  in DIMACS:
 21539  21540 -21541 -180 -21542 0
 21539  21540 -21541 -180  21543 0
 21539  21540 -21541 -180 -21544 0

c  2+1 --> break 
c    (-b^{180, 1}_2 ∧  b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧  p_180) -> break
c  in CNF:
c     b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ -p_180 ∨ break
c  in DIMACS:
 21539 -21540  21541 -180 1162 0


c  2-1 --> 1
c    (-b^{180, 1}_2 ∧  b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧ -p_180) -> (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0)
c  in CNF:
c     b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_2
c     b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_1
c     b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨  b^{180, 2}_0
c  in DIMACS:
 21539 -21540  21541  180 -21542 0
 21539 -21540  21541  180 -21543 0
 21539 -21540  21541  180  21544 0

c  1-1 --> 0
c    (-b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧  b^{180, 1}_0 ∧ -p_180) -> (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧ -b^{180, 2}_0)
c  in CNF:
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_2
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_1
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_0
c  in DIMACS:
 21539  21540 -21541  180 -21542 0
 21539  21540 -21541  180 -21543 0
 21539  21540 -21541  180 -21544 0

c  0-1 --> -1
c    (-b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧ -p_180) -> ( b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0)
c  in CNF:
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨  b^{180, 2}_2
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_1
c     b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨  b^{180, 2}_0
c  in DIMACS:
 21539  21540  21541  180  21542 0
 21539  21540  21541  180 -21543 0
 21539  21540  21541  180  21544 0

c  -1-1 --> -2
c    ( b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧  b^{180, 1}_0 ∧ -p_180) -> ( b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0)
c  in CNF:
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨  b^{180, 2}_2
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨  b^{180, 2}_1
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨  p_180 ∨ -b^{180, 2}_0
c  in DIMACS:
-21539  21540 -21541  180  21542 0
-21539  21540 -21541  180  21543 0
-21539  21540 -21541  180 -21544 0

c  -2-1 --> break 
c    ( b^{180, 1}_2 ∧  b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧ -p_180) -> break
c  in CNF:
c    -b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨  b^{180, 1}_0 ∨  p_180 ∨ break
c  in DIMACS:
-21539 -21540  21541  180 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 1}_2 ∧ -b^{180, 1}_1 ∧ -b^{180, 1}_0 ∧ true) 
c  in CNF:
c    -b^{180, 1}_2 ∨  b^{180, 1}_1 ∨  b^{180, 1}_0 ∨ false 
c  in DIMACS:
-21539  21540  21541  0

c  3 does not represent an automaton state.
c    -(-b^{180, 1}_2 ∧  b^{180, 1}_1 ∧  b^{180, 1}_0 ∧ true) 
c  in CNF:
c     b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ false 
c  in DIMACS:
 21539 -21540 -21541  0
c  -3 does not represent an automaton state.
c    -( b^{180, 1}_2 ∧  b^{180, 1}_1 ∧  b^{180, 1}_0 ∧ true) 
c  in CNF:
c    -b^{180, 1}_2 ∨ -b^{180, 1}_1 ∨ -b^{180, 1}_0 ∨ false 
c  in DIMACS:
-21539 -21540 -21541  0

c i = 2
c  -2+1 --> -1
c    ( b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧  p_360) -> ( b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0)
c  in CNF:
c    -b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨  b^{180, 3}_2
c    -b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_1
c    -b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨  b^{180, 3}_0
c  in DIMACS:
-21542 -21543  21544 -360  21545 0
-21542 -21543  21544 -360 -21546 0
-21542 -21543  21544 -360  21547 0

c  -1+1 --> 0
c    ( b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0 ∧  p_360) -> (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧ -b^{180, 3}_0)
c  in CNF:
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_2
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_1
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_0
c  in DIMACS:
-21542  21543 -21544 -360 -21545 0
-21542  21543 -21544 -360 -21546 0
-21542  21543 -21544 -360 -21547 0

c  0+1 --> 1
c    (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧  p_360) -> (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0)
c  in CNF:
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_2
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_1
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨  b^{180, 3}_0
c  in DIMACS:
 21542  21543  21544 -360 -21545 0
 21542  21543  21544 -360 -21546 0
 21542  21543  21544 -360  21547 0

c  1+1 --> 2
c    (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0 ∧  p_360) -> (-b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0)
c  in CNF:
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_2
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨  b^{180, 3}_1
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ -p_360 ∨ -b^{180, 3}_0
c  in DIMACS:
 21542  21543 -21544 -360 -21545 0
 21542  21543 -21544 -360  21546 0
 21542  21543 -21544 -360 -21547 0

c  2+1 --> break 
c    (-b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧  p_360) -> break
c  in CNF:
c     b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 21542 -21543  21544 -360 1162 0


c  2-1 --> 1
c    (-b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧ -p_360) -> (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0)
c  in CNF:
c     b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_2
c     b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_1
c     b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨  b^{180, 3}_0
c  in DIMACS:
 21542 -21543  21544  360 -21545 0
 21542 -21543  21544  360 -21546 0
 21542 -21543  21544  360  21547 0

c  1-1 --> 0
c    (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0 ∧ -p_360) -> (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧ -b^{180, 3}_0)
c  in CNF:
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_2
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_1
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_0
c  in DIMACS:
 21542  21543 -21544  360 -21545 0
 21542  21543 -21544  360 -21546 0
 21542  21543 -21544  360 -21547 0

c  0-1 --> -1
c    (-b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧ -p_360) -> ( b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0)
c  in CNF:
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨  b^{180, 3}_2
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_1
c     b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨  b^{180, 3}_0
c  in DIMACS:
 21542  21543  21544  360  21545 0
 21542  21543  21544  360 -21546 0
 21542  21543  21544  360  21547 0

c  -1-1 --> -2
c    ( b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧  b^{180, 2}_0 ∧ -p_360) -> ( b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0)
c  in CNF:
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨  b^{180, 3}_2
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨  b^{180, 3}_1
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨  p_360 ∨ -b^{180, 3}_0
c  in DIMACS:
-21542  21543 -21544  360  21545 0
-21542  21543 -21544  360  21546 0
-21542  21543 -21544  360 -21547 0

c  -2-1 --> break 
c    ( b^{180, 2}_2 ∧  b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨  b^{180, 2}_0 ∨  p_360 ∨ break
c  in DIMACS:
-21542 -21543  21544  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 2}_2 ∧ -b^{180, 2}_1 ∧ -b^{180, 2}_0 ∧ true) 
c  in CNF:
c    -b^{180, 2}_2 ∨  b^{180, 2}_1 ∨  b^{180, 2}_0 ∨ false 
c  in DIMACS:
-21542  21543  21544  0

c  3 does not represent an automaton state.
c    -(-b^{180, 2}_2 ∧  b^{180, 2}_1 ∧  b^{180, 2}_0 ∧ true) 
c  in CNF:
c     b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ false 
c  in DIMACS:
 21542 -21543 -21544  0
c  -3 does not represent an automaton state.
c    -( b^{180, 2}_2 ∧  b^{180, 2}_1 ∧  b^{180, 2}_0 ∧ true) 
c  in CNF:
c    -b^{180, 2}_2 ∨ -b^{180, 2}_1 ∨ -b^{180, 2}_0 ∨ false 
c  in DIMACS:
-21542 -21543 -21544  0

c i = 3
c  -2+1 --> -1
c    ( b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧  p_540) -> ( b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0)
c  in CNF:
c    -b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨  b^{180, 4}_2
c    -b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_1
c    -b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨  b^{180, 4}_0
c  in DIMACS:
-21545 -21546  21547 -540  21548 0
-21545 -21546  21547 -540 -21549 0
-21545 -21546  21547 -540  21550 0

c  -1+1 --> 0
c    ( b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0 ∧  p_540) -> (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧ -b^{180, 4}_0)
c  in CNF:
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_2
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_1
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_0
c  in DIMACS:
-21545  21546 -21547 -540 -21548 0
-21545  21546 -21547 -540 -21549 0
-21545  21546 -21547 -540 -21550 0

c  0+1 --> 1
c    (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧  p_540) -> (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0)
c  in CNF:
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_2
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_1
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨  b^{180, 4}_0
c  in DIMACS:
 21545  21546  21547 -540 -21548 0
 21545  21546  21547 -540 -21549 0
 21545  21546  21547 -540  21550 0

c  1+1 --> 2
c    (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0 ∧  p_540) -> (-b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0)
c  in CNF:
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_2
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨  b^{180, 4}_1
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ -p_540 ∨ -b^{180, 4}_0
c  in DIMACS:
 21545  21546 -21547 -540 -21548 0
 21545  21546 -21547 -540  21549 0
 21545  21546 -21547 -540 -21550 0

c  2+1 --> break 
c    (-b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧  p_540) -> break
c  in CNF:
c     b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 21545 -21546  21547 -540 1162 0


c  2-1 --> 1
c    (-b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧ -p_540) -> (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0)
c  in CNF:
c     b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_2
c     b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_1
c     b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨  b^{180, 4}_0
c  in DIMACS:
 21545 -21546  21547  540 -21548 0
 21545 -21546  21547  540 -21549 0
 21545 -21546  21547  540  21550 0

c  1-1 --> 0
c    (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0 ∧ -p_540) -> (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧ -b^{180, 4}_0)
c  in CNF:
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_2
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_1
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_0
c  in DIMACS:
 21545  21546 -21547  540 -21548 0
 21545  21546 -21547  540 -21549 0
 21545  21546 -21547  540 -21550 0

c  0-1 --> -1
c    (-b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧ -p_540) -> ( b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0)
c  in CNF:
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨  b^{180, 4}_2
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_1
c     b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨  b^{180, 4}_0
c  in DIMACS:
 21545  21546  21547  540  21548 0
 21545  21546  21547  540 -21549 0
 21545  21546  21547  540  21550 0

c  -1-1 --> -2
c    ( b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧  b^{180, 3}_0 ∧ -p_540) -> ( b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0)
c  in CNF:
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨  b^{180, 4}_2
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨  b^{180, 4}_1
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨  p_540 ∨ -b^{180, 4}_0
c  in DIMACS:
-21545  21546 -21547  540  21548 0
-21545  21546 -21547  540  21549 0
-21545  21546 -21547  540 -21550 0

c  -2-1 --> break 
c    ( b^{180, 3}_2 ∧  b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨  b^{180, 3}_0 ∨  p_540 ∨ break
c  in DIMACS:
-21545 -21546  21547  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 3}_2 ∧ -b^{180, 3}_1 ∧ -b^{180, 3}_0 ∧ true) 
c  in CNF:
c    -b^{180, 3}_2 ∨  b^{180, 3}_1 ∨  b^{180, 3}_0 ∨ false 
c  in DIMACS:
-21545  21546  21547  0

c  3 does not represent an automaton state.
c    -(-b^{180, 3}_2 ∧  b^{180, 3}_1 ∧  b^{180, 3}_0 ∧ true) 
c  in CNF:
c     b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ false 
c  in DIMACS:
 21545 -21546 -21547  0
c  -3 does not represent an automaton state.
c    -( b^{180, 3}_2 ∧  b^{180, 3}_1 ∧  b^{180, 3}_0 ∧ true) 
c  in CNF:
c    -b^{180, 3}_2 ∨ -b^{180, 3}_1 ∨ -b^{180, 3}_0 ∨ false 
c  in DIMACS:
-21545 -21546 -21547  0

c i = 4
c  -2+1 --> -1
c    ( b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧  p_720) -> ( b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0)
c  in CNF:
c    -b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨  b^{180, 5}_2
c    -b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_1
c    -b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨  b^{180, 5}_0
c  in DIMACS:
-21548 -21549  21550 -720  21551 0
-21548 -21549  21550 -720 -21552 0
-21548 -21549  21550 -720  21553 0

c  -1+1 --> 0
c    ( b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0 ∧  p_720) -> (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧ -b^{180, 5}_0)
c  in CNF:
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_2
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_1
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_0
c  in DIMACS:
-21548  21549 -21550 -720 -21551 0
-21548  21549 -21550 -720 -21552 0
-21548  21549 -21550 -720 -21553 0

c  0+1 --> 1
c    (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧  p_720) -> (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0)
c  in CNF:
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_2
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_1
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨  b^{180, 5}_0
c  in DIMACS:
 21548  21549  21550 -720 -21551 0
 21548  21549  21550 -720 -21552 0
 21548  21549  21550 -720  21553 0

c  1+1 --> 2
c    (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0 ∧  p_720) -> (-b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0)
c  in CNF:
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_2
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨  b^{180, 5}_1
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ -p_720 ∨ -b^{180, 5}_0
c  in DIMACS:
 21548  21549 -21550 -720 -21551 0
 21548  21549 -21550 -720  21552 0
 21548  21549 -21550 -720 -21553 0

c  2+1 --> break 
c    (-b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧  p_720) -> break
c  in CNF:
c     b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 21548 -21549  21550 -720 1162 0


c  2-1 --> 1
c    (-b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧ -p_720) -> (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0)
c  in CNF:
c     b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_2
c     b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_1
c     b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨  b^{180, 5}_0
c  in DIMACS:
 21548 -21549  21550  720 -21551 0
 21548 -21549  21550  720 -21552 0
 21548 -21549  21550  720  21553 0

c  1-1 --> 0
c    (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0 ∧ -p_720) -> (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧ -b^{180, 5}_0)
c  in CNF:
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_2
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_1
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_0
c  in DIMACS:
 21548  21549 -21550  720 -21551 0
 21548  21549 -21550  720 -21552 0
 21548  21549 -21550  720 -21553 0

c  0-1 --> -1
c    (-b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧ -p_720) -> ( b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0)
c  in CNF:
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨  b^{180, 5}_2
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_1
c     b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨  b^{180, 5}_0
c  in DIMACS:
 21548  21549  21550  720  21551 0
 21548  21549  21550  720 -21552 0
 21548  21549  21550  720  21553 0

c  -1-1 --> -2
c    ( b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧  b^{180, 4}_0 ∧ -p_720) -> ( b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0)
c  in CNF:
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨  b^{180, 5}_2
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨  b^{180, 5}_1
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨  p_720 ∨ -b^{180, 5}_0
c  in DIMACS:
-21548  21549 -21550  720  21551 0
-21548  21549 -21550  720  21552 0
-21548  21549 -21550  720 -21553 0

c  -2-1 --> break 
c    ( b^{180, 4}_2 ∧  b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨  b^{180, 4}_0 ∨  p_720 ∨ break
c  in DIMACS:
-21548 -21549  21550  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 4}_2 ∧ -b^{180, 4}_1 ∧ -b^{180, 4}_0 ∧ true) 
c  in CNF:
c    -b^{180, 4}_2 ∨  b^{180, 4}_1 ∨  b^{180, 4}_0 ∨ false 
c  in DIMACS:
-21548  21549  21550  0

c  3 does not represent an automaton state.
c    -(-b^{180, 4}_2 ∧  b^{180, 4}_1 ∧  b^{180, 4}_0 ∧ true) 
c  in CNF:
c     b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ false 
c  in DIMACS:
 21548 -21549 -21550  0
c  -3 does not represent an automaton state.
c    -( b^{180, 4}_2 ∧  b^{180, 4}_1 ∧  b^{180, 4}_0 ∧ true) 
c  in CNF:
c    -b^{180, 4}_2 ∨ -b^{180, 4}_1 ∨ -b^{180, 4}_0 ∨ false 
c  in DIMACS:
-21548 -21549 -21550  0

c i = 5
c  -2+1 --> -1
c    ( b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧  p_900) -> ( b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0)
c  in CNF:
c    -b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨  b^{180, 6}_2
c    -b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_1
c    -b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨  b^{180, 6}_0
c  in DIMACS:
-21551 -21552  21553 -900  21554 0
-21551 -21552  21553 -900 -21555 0
-21551 -21552  21553 -900  21556 0

c  -1+1 --> 0
c    ( b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0 ∧  p_900) -> (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧ -b^{180, 6}_0)
c  in CNF:
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_2
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_1
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_0
c  in DIMACS:
-21551  21552 -21553 -900 -21554 0
-21551  21552 -21553 -900 -21555 0
-21551  21552 -21553 -900 -21556 0

c  0+1 --> 1
c    (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧  p_900) -> (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0)
c  in CNF:
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_2
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_1
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨  b^{180, 6}_0
c  in DIMACS:
 21551  21552  21553 -900 -21554 0
 21551  21552  21553 -900 -21555 0
 21551  21552  21553 -900  21556 0

c  1+1 --> 2
c    (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0 ∧  p_900) -> (-b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0)
c  in CNF:
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_2
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨  b^{180, 6}_1
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ -p_900 ∨ -b^{180, 6}_0
c  in DIMACS:
 21551  21552 -21553 -900 -21554 0
 21551  21552 -21553 -900  21555 0
 21551  21552 -21553 -900 -21556 0

c  2+1 --> break 
c    (-b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧  p_900) -> break
c  in CNF:
c     b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 21551 -21552  21553 -900 1162 0


c  2-1 --> 1
c    (-b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧ -p_900) -> (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0)
c  in CNF:
c     b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_2
c     b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_1
c     b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨  b^{180, 6}_0
c  in DIMACS:
 21551 -21552  21553  900 -21554 0
 21551 -21552  21553  900 -21555 0
 21551 -21552  21553  900  21556 0

c  1-1 --> 0
c    (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0 ∧ -p_900) -> (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧ -b^{180, 6}_0)
c  in CNF:
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_2
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_1
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_0
c  in DIMACS:
 21551  21552 -21553  900 -21554 0
 21551  21552 -21553  900 -21555 0
 21551  21552 -21553  900 -21556 0

c  0-1 --> -1
c    (-b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧ -p_900) -> ( b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0)
c  in CNF:
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨  b^{180, 6}_2
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_1
c     b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨  b^{180, 6}_0
c  in DIMACS:
 21551  21552  21553  900  21554 0
 21551  21552  21553  900 -21555 0
 21551  21552  21553  900  21556 0

c  -1-1 --> -2
c    ( b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧  b^{180, 5}_0 ∧ -p_900) -> ( b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0)
c  in CNF:
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨  b^{180, 6}_2
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨  b^{180, 6}_1
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨  p_900 ∨ -b^{180, 6}_0
c  in DIMACS:
-21551  21552 -21553  900  21554 0
-21551  21552 -21553  900  21555 0
-21551  21552 -21553  900 -21556 0

c  -2-1 --> break 
c    ( b^{180, 5}_2 ∧  b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨  b^{180, 5}_0 ∨  p_900 ∨ break
c  in DIMACS:
-21551 -21552  21553  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 5}_2 ∧ -b^{180, 5}_1 ∧ -b^{180, 5}_0 ∧ true) 
c  in CNF:
c    -b^{180, 5}_2 ∨  b^{180, 5}_1 ∨  b^{180, 5}_0 ∨ false 
c  in DIMACS:
-21551  21552  21553  0

c  3 does not represent an automaton state.
c    -(-b^{180, 5}_2 ∧  b^{180, 5}_1 ∧  b^{180, 5}_0 ∧ true) 
c  in CNF:
c     b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ false 
c  in DIMACS:
 21551 -21552 -21553  0
c  -3 does not represent an automaton state.
c    -( b^{180, 5}_2 ∧  b^{180, 5}_1 ∧  b^{180, 5}_0 ∧ true) 
c  in CNF:
c    -b^{180, 5}_2 ∨ -b^{180, 5}_1 ∨ -b^{180, 5}_0 ∨ false 
c  in DIMACS:
-21551 -21552 -21553  0

c i = 6
c  -2+1 --> -1
c    ( b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧  p_1080) -> ( b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧  b^{180, 7}_0)
c  in CNF:
c    -b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨  b^{180, 7}_2
c    -b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_1
c    -b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨  b^{180, 7}_0
c  in DIMACS:
-21554 -21555  21556 -1080  21557 0
-21554 -21555  21556 -1080 -21558 0
-21554 -21555  21556 -1080  21559 0

c  -1+1 --> 0
c    ( b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0 ∧  p_1080) -> (-b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧ -b^{180, 7}_0)
c  in CNF:
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_2
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_1
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_0
c  in DIMACS:
-21554  21555 -21556 -1080 -21557 0
-21554  21555 -21556 -1080 -21558 0
-21554  21555 -21556 -1080 -21559 0

c  0+1 --> 1
c    (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧  p_1080) -> (-b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧  b^{180, 7}_0)
c  in CNF:
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_2
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_1
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨  b^{180, 7}_0
c  in DIMACS:
 21554  21555  21556 -1080 -21557 0
 21554  21555  21556 -1080 -21558 0
 21554  21555  21556 -1080  21559 0

c  1+1 --> 2
c    (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0 ∧  p_1080) -> (-b^{180, 7}_2 ∧  b^{180, 7}_1 ∧ -b^{180, 7}_0)
c  in CNF:
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_2
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨  b^{180, 7}_1
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ -p_1080 ∨ -b^{180, 7}_0
c  in DIMACS:
 21554  21555 -21556 -1080 -21557 0
 21554  21555 -21556 -1080  21558 0
 21554  21555 -21556 -1080 -21559 0

c  2+1 --> break 
c    (-b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 21554 -21555  21556 -1080 1162 0


c  2-1 --> 1
c    (-b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧ -p_1080) -> (-b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧  b^{180, 7}_0)
c  in CNF:
c     b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_2
c     b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_1
c     b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨  b^{180, 7}_0
c  in DIMACS:
 21554 -21555  21556  1080 -21557 0
 21554 -21555  21556  1080 -21558 0
 21554 -21555  21556  1080  21559 0

c  1-1 --> 0
c    (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0 ∧ -p_1080) -> (-b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧ -b^{180, 7}_0)
c  in CNF:
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_2
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_1
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_0
c  in DIMACS:
 21554  21555 -21556  1080 -21557 0
 21554  21555 -21556  1080 -21558 0
 21554  21555 -21556  1080 -21559 0

c  0-1 --> -1
c    (-b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧ -p_1080) -> ( b^{180, 7}_2 ∧ -b^{180, 7}_1 ∧  b^{180, 7}_0)
c  in CNF:
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨  b^{180, 7}_2
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_1
c     b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨  b^{180, 7}_0
c  in DIMACS:
 21554  21555  21556  1080  21557 0
 21554  21555  21556  1080 -21558 0
 21554  21555  21556  1080  21559 0

c  -1-1 --> -2
c    ( b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧  b^{180, 6}_0 ∧ -p_1080) -> ( b^{180, 7}_2 ∧  b^{180, 7}_1 ∧ -b^{180, 7}_0)
c  in CNF:
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨  b^{180, 7}_2
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨  b^{180, 7}_1
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨  p_1080 ∨ -b^{180, 7}_0
c  in DIMACS:
-21554  21555 -21556  1080  21557 0
-21554  21555 -21556  1080  21558 0
-21554  21555 -21556  1080 -21559 0

c  -2-1 --> break 
c    ( b^{180, 6}_2 ∧  b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨  b^{180, 6}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-21554 -21555  21556  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{180, 6}_2 ∧ -b^{180, 6}_1 ∧ -b^{180, 6}_0 ∧ true) 
c  in CNF:
c    -b^{180, 6}_2 ∨  b^{180, 6}_1 ∨  b^{180, 6}_0 ∨ false 
c  in DIMACS:
-21554  21555  21556  0

c  3 does not represent an automaton state.
c    -(-b^{180, 6}_2 ∧  b^{180, 6}_1 ∧  b^{180, 6}_0 ∧ true) 
c  in CNF:
c     b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ false 
c  in DIMACS:
 21554 -21555 -21556  0
c  -3 does not represent an automaton state.
c    -( b^{180, 6}_2 ∧  b^{180, 6}_1 ∧  b^{180, 6}_0 ∧ true) 
c  in CNF:
c    -b^{180, 6}_2 ∨ -b^{180, 6}_1 ∨ -b^{180, 6}_0 ∨ false 
c  in DIMACS:
-21554 -21555 -21556  0

c INIT for k = 181
c    -b^{181, 1}_2
c    -b^{181, 1}_1
c    -b^{181, 1}_0
c  in DIMACS:
-21560 0
-21561 0
-21562 0

c Transitions for k = 181
c i = 1
c  -2+1 --> -1
c    ( b^{181, 1}_2 ∧  b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧  p_181) -> ( b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0)
c  in CNF:
c    -b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨  b^{181, 2}_2
c    -b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_1
c    -b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨  b^{181, 2}_0
c  in DIMACS:
-21560 -21561  21562 -181  21563 0
-21560 -21561  21562 -181 -21564 0
-21560 -21561  21562 -181  21565 0

c  -1+1 --> 0
c    ( b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧  b^{181, 1}_0 ∧  p_181) -> (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧ -b^{181, 2}_0)
c  in CNF:
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_2
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_1
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_0
c  in DIMACS:
-21560  21561 -21562 -181 -21563 0
-21560  21561 -21562 -181 -21564 0
-21560  21561 -21562 -181 -21565 0

c  0+1 --> 1
c    (-b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧  p_181) -> (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0)
c  in CNF:
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_2
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_1
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨  b^{181, 2}_0
c  in DIMACS:
 21560  21561  21562 -181 -21563 0
 21560  21561  21562 -181 -21564 0
 21560  21561  21562 -181  21565 0

c  1+1 --> 2
c    (-b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧  b^{181, 1}_0 ∧  p_181) -> (-b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0)
c  in CNF:
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_2
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨  b^{181, 2}_1
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ -p_181 ∨ -b^{181, 2}_0
c  in DIMACS:
 21560  21561 -21562 -181 -21563 0
 21560  21561 -21562 -181  21564 0
 21560  21561 -21562 -181 -21565 0

c  2+1 --> break 
c    (-b^{181, 1}_2 ∧  b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧  p_181) -> break
c  in CNF:
c     b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ -p_181 ∨ break
c  in DIMACS:
 21560 -21561  21562 -181 1162 0


c  2-1 --> 1
c    (-b^{181, 1}_2 ∧  b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧ -p_181) -> (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0)
c  in CNF:
c     b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_2
c     b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_1
c     b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨  b^{181, 2}_0
c  in DIMACS:
 21560 -21561  21562  181 -21563 0
 21560 -21561  21562  181 -21564 0
 21560 -21561  21562  181  21565 0

c  1-1 --> 0
c    (-b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧  b^{181, 1}_0 ∧ -p_181) -> (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧ -b^{181, 2}_0)
c  in CNF:
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_2
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_1
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_0
c  in DIMACS:
 21560  21561 -21562  181 -21563 0
 21560  21561 -21562  181 -21564 0
 21560  21561 -21562  181 -21565 0

c  0-1 --> -1
c    (-b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧ -p_181) -> ( b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0)
c  in CNF:
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨  b^{181, 2}_2
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_1
c     b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨  b^{181, 2}_0
c  in DIMACS:
 21560  21561  21562  181  21563 0
 21560  21561  21562  181 -21564 0
 21560  21561  21562  181  21565 0

c  -1-1 --> -2
c    ( b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧  b^{181, 1}_0 ∧ -p_181) -> ( b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0)
c  in CNF:
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨  b^{181, 2}_2
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨  b^{181, 2}_1
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨  p_181 ∨ -b^{181, 2}_0
c  in DIMACS:
-21560  21561 -21562  181  21563 0
-21560  21561 -21562  181  21564 0
-21560  21561 -21562  181 -21565 0

c  -2-1 --> break 
c    ( b^{181, 1}_2 ∧  b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧ -p_181) -> break
c  in CNF:
c    -b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨  b^{181, 1}_0 ∨  p_181 ∨ break
c  in DIMACS:
-21560 -21561  21562  181 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 1}_2 ∧ -b^{181, 1}_1 ∧ -b^{181, 1}_0 ∧ true) 
c  in CNF:
c    -b^{181, 1}_2 ∨  b^{181, 1}_1 ∨  b^{181, 1}_0 ∨ false 
c  in DIMACS:
-21560  21561  21562  0

c  3 does not represent an automaton state.
c    -(-b^{181, 1}_2 ∧  b^{181, 1}_1 ∧  b^{181, 1}_0 ∧ true) 
c  in CNF:
c     b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ false 
c  in DIMACS:
 21560 -21561 -21562  0
c  -3 does not represent an automaton state.
c    -( b^{181, 1}_2 ∧  b^{181, 1}_1 ∧  b^{181, 1}_0 ∧ true) 
c  in CNF:
c    -b^{181, 1}_2 ∨ -b^{181, 1}_1 ∨ -b^{181, 1}_0 ∨ false 
c  in DIMACS:
-21560 -21561 -21562  0

c i = 2
c  -2+1 --> -1
c    ( b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧  p_362) -> ( b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0)
c  in CNF:
c    -b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨  b^{181, 3}_2
c    -b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_1
c    -b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨  b^{181, 3}_0
c  in DIMACS:
-21563 -21564  21565 -362  21566 0
-21563 -21564  21565 -362 -21567 0
-21563 -21564  21565 -362  21568 0

c  -1+1 --> 0
c    ( b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0 ∧  p_362) -> (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧ -b^{181, 3}_0)
c  in CNF:
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_2
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_1
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_0
c  in DIMACS:
-21563  21564 -21565 -362 -21566 0
-21563  21564 -21565 -362 -21567 0
-21563  21564 -21565 -362 -21568 0

c  0+1 --> 1
c    (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧  p_362) -> (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0)
c  in CNF:
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_2
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_1
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨  b^{181, 3}_0
c  in DIMACS:
 21563  21564  21565 -362 -21566 0
 21563  21564  21565 -362 -21567 0
 21563  21564  21565 -362  21568 0

c  1+1 --> 2
c    (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0 ∧  p_362) -> (-b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0)
c  in CNF:
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_2
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨  b^{181, 3}_1
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ -p_362 ∨ -b^{181, 3}_0
c  in DIMACS:
 21563  21564 -21565 -362 -21566 0
 21563  21564 -21565 -362  21567 0
 21563  21564 -21565 -362 -21568 0

c  2+1 --> break 
c    (-b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧  p_362) -> break
c  in CNF:
c     b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ -p_362 ∨ break
c  in DIMACS:
 21563 -21564  21565 -362 1162 0


c  2-1 --> 1
c    (-b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧ -p_362) -> (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0)
c  in CNF:
c     b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_2
c     b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_1
c     b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨  b^{181, 3}_0
c  in DIMACS:
 21563 -21564  21565  362 -21566 0
 21563 -21564  21565  362 -21567 0
 21563 -21564  21565  362  21568 0

c  1-1 --> 0
c    (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0 ∧ -p_362) -> (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧ -b^{181, 3}_0)
c  in CNF:
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_2
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_1
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_0
c  in DIMACS:
 21563  21564 -21565  362 -21566 0
 21563  21564 -21565  362 -21567 0
 21563  21564 -21565  362 -21568 0

c  0-1 --> -1
c    (-b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧ -p_362) -> ( b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0)
c  in CNF:
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨  b^{181, 3}_2
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_1
c     b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨  b^{181, 3}_0
c  in DIMACS:
 21563  21564  21565  362  21566 0
 21563  21564  21565  362 -21567 0
 21563  21564  21565  362  21568 0

c  -1-1 --> -2
c    ( b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧  b^{181, 2}_0 ∧ -p_362) -> ( b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0)
c  in CNF:
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨  b^{181, 3}_2
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨  b^{181, 3}_1
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨  p_362 ∨ -b^{181, 3}_0
c  in DIMACS:
-21563  21564 -21565  362  21566 0
-21563  21564 -21565  362  21567 0
-21563  21564 -21565  362 -21568 0

c  -2-1 --> break 
c    ( b^{181, 2}_2 ∧  b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧ -p_362) -> break
c  in CNF:
c    -b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨  b^{181, 2}_0 ∨  p_362 ∨ break
c  in DIMACS:
-21563 -21564  21565  362 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 2}_2 ∧ -b^{181, 2}_1 ∧ -b^{181, 2}_0 ∧ true) 
c  in CNF:
c    -b^{181, 2}_2 ∨  b^{181, 2}_1 ∨  b^{181, 2}_0 ∨ false 
c  in DIMACS:
-21563  21564  21565  0

c  3 does not represent an automaton state.
c    -(-b^{181, 2}_2 ∧  b^{181, 2}_1 ∧  b^{181, 2}_0 ∧ true) 
c  in CNF:
c     b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ false 
c  in DIMACS:
 21563 -21564 -21565  0
c  -3 does not represent an automaton state.
c    -( b^{181, 2}_2 ∧  b^{181, 2}_1 ∧  b^{181, 2}_0 ∧ true) 
c  in CNF:
c    -b^{181, 2}_2 ∨ -b^{181, 2}_1 ∨ -b^{181, 2}_0 ∨ false 
c  in DIMACS:
-21563 -21564 -21565  0

c i = 3
c  -2+1 --> -1
c    ( b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧  p_543) -> ( b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0)
c  in CNF:
c    -b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨  b^{181, 4}_2
c    -b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_1
c    -b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨  b^{181, 4}_0
c  in DIMACS:
-21566 -21567  21568 -543  21569 0
-21566 -21567  21568 -543 -21570 0
-21566 -21567  21568 -543  21571 0

c  -1+1 --> 0
c    ( b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0 ∧  p_543) -> (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧ -b^{181, 4}_0)
c  in CNF:
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_2
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_1
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_0
c  in DIMACS:
-21566  21567 -21568 -543 -21569 0
-21566  21567 -21568 -543 -21570 0
-21566  21567 -21568 -543 -21571 0

c  0+1 --> 1
c    (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧  p_543) -> (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0)
c  in CNF:
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_2
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_1
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨  b^{181, 4}_0
c  in DIMACS:
 21566  21567  21568 -543 -21569 0
 21566  21567  21568 -543 -21570 0
 21566  21567  21568 -543  21571 0

c  1+1 --> 2
c    (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0 ∧  p_543) -> (-b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0)
c  in CNF:
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_2
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨  b^{181, 4}_1
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ -p_543 ∨ -b^{181, 4}_0
c  in DIMACS:
 21566  21567 -21568 -543 -21569 0
 21566  21567 -21568 -543  21570 0
 21566  21567 -21568 -543 -21571 0

c  2+1 --> break 
c    (-b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧  p_543) -> break
c  in CNF:
c     b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ -p_543 ∨ break
c  in DIMACS:
 21566 -21567  21568 -543 1162 0


c  2-1 --> 1
c    (-b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧ -p_543) -> (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0)
c  in CNF:
c     b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_2
c     b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_1
c     b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨  b^{181, 4}_0
c  in DIMACS:
 21566 -21567  21568  543 -21569 0
 21566 -21567  21568  543 -21570 0
 21566 -21567  21568  543  21571 0

c  1-1 --> 0
c    (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0 ∧ -p_543) -> (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧ -b^{181, 4}_0)
c  in CNF:
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_2
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_1
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_0
c  in DIMACS:
 21566  21567 -21568  543 -21569 0
 21566  21567 -21568  543 -21570 0
 21566  21567 -21568  543 -21571 0

c  0-1 --> -1
c    (-b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧ -p_543) -> ( b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0)
c  in CNF:
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨  b^{181, 4}_2
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_1
c     b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨  b^{181, 4}_0
c  in DIMACS:
 21566  21567  21568  543  21569 0
 21566  21567  21568  543 -21570 0
 21566  21567  21568  543  21571 0

c  -1-1 --> -2
c    ( b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧  b^{181, 3}_0 ∧ -p_543) -> ( b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0)
c  in CNF:
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨  b^{181, 4}_2
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨  b^{181, 4}_1
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨  p_543 ∨ -b^{181, 4}_0
c  in DIMACS:
-21566  21567 -21568  543  21569 0
-21566  21567 -21568  543  21570 0
-21566  21567 -21568  543 -21571 0

c  -2-1 --> break 
c    ( b^{181, 3}_2 ∧  b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧ -p_543) -> break
c  in CNF:
c    -b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨  b^{181, 3}_0 ∨  p_543 ∨ break
c  in DIMACS:
-21566 -21567  21568  543 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 3}_2 ∧ -b^{181, 3}_1 ∧ -b^{181, 3}_0 ∧ true) 
c  in CNF:
c    -b^{181, 3}_2 ∨  b^{181, 3}_1 ∨  b^{181, 3}_0 ∨ false 
c  in DIMACS:
-21566  21567  21568  0

c  3 does not represent an automaton state.
c    -(-b^{181, 3}_2 ∧  b^{181, 3}_1 ∧  b^{181, 3}_0 ∧ true) 
c  in CNF:
c     b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ false 
c  in DIMACS:
 21566 -21567 -21568  0
c  -3 does not represent an automaton state.
c    -( b^{181, 3}_2 ∧  b^{181, 3}_1 ∧  b^{181, 3}_0 ∧ true) 
c  in CNF:
c    -b^{181, 3}_2 ∨ -b^{181, 3}_1 ∨ -b^{181, 3}_0 ∨ false 
c  in DIMACS:
-21566 -21567 -21568  0

c i = 4
c  -2+1 --> -1
c    ( b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧  p_724) -> ( b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0)
c  in CNF:
c    -b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨  b^{181, 5}_2
c    -b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_1
c    -b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨  b^{181, 5}_0
c  in DIMACS:
-21569 -21570  21571 -724  21572 0
-21569 -21570  21571 -724 -21573 0
-21569 -21570  21571 -724  21574 0

c  -1+1 --> 0
c    ( b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0 ∧  p_724) -> (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧ -b^{181, 5}_0)
c  in CNF:
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_2
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_1
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_0
c  in DIMACS:
-21569  21570 -21571 -724 -21572 0
-21569  21570 -21571 -724 -21573 0
-21569  21570 -21571 -724 -21574 0

c  0+1 --> 1
c    (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧  p_724) -> (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0)
c  in CNF:
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_2
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_1
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨  b^{181, 5}_0
c  in DIMACS:
 21569  21570  21571 -724 -21572 0
 21569  21570  21571 -724 -21573 0
 21569  21570  21571 -724  21574 0

c  1+1 --> 2
c    (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0 ∧  p_724) -> (-b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0)
c  in CNF:
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_2
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨  b^{181, 5}_1
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ -p_724 ∨ -b^{181, 5}_0
c  in DIMACS:
 21569  21570 -21571 -724 -21572 0
 21569  21570 -21571 -724  21573 0
 21569  21570 -21571 -724 -21574 0

c  2+1 --> break 
c    (-b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧  p_724) -> break
c  in CNF:
c     b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ -p_724 ∨ break
c  in DIMACS:
 21569 -21570  21571 -724 1162 0


c  2-1 --> 1
c    (-b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧ -p_724) -> (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0)
c  in CNF:
c     b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_2
c     b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_1
c     b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨  b^{181, 5}_0
c  in DIMACS:
 21569 -21570  21571  724 -21572 0
 21569 -21570  21571  724 -21573 0
 21569 -21570  21571  724  21574 0

c  1-1 --> 0
c    (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0 ∧ -p_724) -> (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧ -b^{181, 5}_0)
c  in CNF:
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_2
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_1
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_0
c  in DIMACS:
 21569  21570 -21571  724 -21572 0
 21569  21570 -21571  724 -21573 0
 21569  21570 -21571  724 -21574 0

c  0-1 --> -1
c    (-b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧ -p_724) -> ( b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0)
c  in CNF:
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨  b^{181, 5}_2
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_1
c     b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨  b^{181, 5}_0
c  in DIMACS:
 21569  21570  21571  724  21572 0
 21569  21570  21571  724 -21573 0
 21569  21570  21571  724  21574 0

c  -1-1 --> -2
c    ( b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧  b^{181, 4}_0 ∧ -p_724) -> ( b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0)
c  in CNF:
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨  b^{181, 5}_2
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨  b^{181, 5}_1
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨  p_724 ∨ -b^{181, 5}_0
c  in DIMACS:
-21569  21570 -21571  724  21572 0
-21569  21570 -21571  724  21573 0
-21569  21570 -21571  724 -21574 0

c  -2-1 --> break 
c    ( b^{181, 4}_2 ∧  b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧ -p_724) -> break
c  in CNF:
c    -b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨  b^{181, 4}_0 ∨  p_724 ∨ break
c  in DIMACS:
-21569 -21570  21571  724 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 4}_2 ∧ -b^{181, 4}_1 ∧ -b^{181, 4}_0 ∧ true) 
c  in CNF:
c    -b^{181, 4}_2 ∨  b^{181, 4}_1 ∨  b^{181, 4}_0 ∨ false 
c  in DIMACS:
-21569  21570  21571  0

c  3 does not represent an automaton state.
c    -(-b^{181, 4}_2 ∧  b^{181, 4}_1 ∧  b^{181, 4}_0 ∧ true) 
c  in CNF:
c     b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ false 
c  in DIMACS:
 21569 -21570 -21571  0
c  -3 does not represent an automaton state.
c    -( b^{181, 4}_2 ∧  b^{181, 4}_1 ∧  b^{181, 4}_0 ∧ true) 
c  in CNF:
c    -b^{181, 4}_2 ∨ -b^{181, 4}_1 ∨ -b^{181, 4}_0 ∨ false 
c  in DIMACS:
-21569 -21570 -21571  0

c i = 5
c  -2+1 --> -1
c    ( b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧  p_905) -> ( b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0)
c  in CNF:
c    -b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨  b^{181, 6}_2
c    -b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_1
c    -b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨  b^{181, 6}_0
c  in DIMACS:
-21572 -21573  21574 -905  21575 0
-21572 -21573  21574 -905 -21576 0
-21572 -21573  21574 -905  21577 0

c  -1+1 --> 0
c    ( b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0 ∧  p_905) -> (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧ -b^{181, 6}_0)
c  in CNF:
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_2
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_1
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_0
c  in DIMACS:
-21572  21573 -21574 -905 -21575 0
-21572  21573 -21574 -905 -21576 0
-21572  21573 -21574 -905 -21577 0

c  0+1 --> 1
c    (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧  p_905) -> (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0)
c  in CNF:
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_2
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_1
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨  b^{181, 6}_0
c  in DIMACS:
 21572  21573  21574 -905 -21575 0
 21572  21573  21574 -905 -21576 0
 21572  21573  21574 -905  21577 0

c  1+1 --> 2
c    (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0 ∧  p_905) -> (-b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0)
c  in CNF:
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_2
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨  b^{181, 6}_1
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ -p_905 ∨ -b^{181, 6}_0
c  in DIMACS:
 21572  21573 -21574 -905 -21575 0
 21572  21573 -21574 -905  21576 0
 21572  21573 -21574 -905 -21577 0

c  2+1 --> break 
c    (-b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧  p_905) -> break
c  in CNF:
c     b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ -p_905 ∨ break
c  in DIMACS:
 21572 -21573  21574 -905 1162 0


c  2-1 --> 1
c    (-b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧ -p_905) -> (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0)
c  in CNF:
c     b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_2
c     b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_1
c     b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨  b^{181, 6}_0
c  in DIMACS:
 21572 -21573  21574  905 -21575 0
 21572 -21573  21574  905 -21576 0
 21572 -21573  21574  905  21577 0

c  1-1 --> 0
c    (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0 ∧ -p_905) -> (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧ -b^{181, 6}_0)
c  in CNF:
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_2
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_1
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_0
c  in DIMACS:
 21572  21573 -21574  905 -21575 0
 21572  21573 -21574  905 -21576 0
 21572  21573 -21574  905 -21577 0

c  0-1 --> -1
c    (-b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧ -p_905) -> ( b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0)
c  in CNF:
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨  b^{181, 6}_2
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_1
c     b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨  b^{181, 6}_0
c  in DIMACS:
 21572  21573  21574  905  21575 0
 21572  21573  21574  905 -21576 0
 21572  21573  21574  905  21577 0

c  -1-1 --> -2
c    ( b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧  b^{181, 5}_0 ∧ -p_905) -> ( b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0)
c  in CNF:
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨  b^{181, 6}_2
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨  b^{181, 6}_1
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨  p_905 ∨ -b^{181, 6}_0
c  in DIMACS:
-21572  21573 -21574  905  21575 0
-21572  21573 -21574  905  21576 0
-21572  21573 -21574  905 -21577 0

c  -2-1 --> break 
c    ( b^{181, 5}_2 ∧  b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧ -p_905) -> break
c  in CNF:
c    -b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨  b^{181, 5}_0 ∨  p_905 ∨ break
c  in DIMACS:
-21572 -21573  21574  905 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 5}_2 ∧ -b^{181, 5}_1 ∧ -b^{181, 5}_0 ∧ true) 
c  in CNF:
c    -b^{181, 5}_2 ∨  b^{181, 5}_1 ∨  b^{181, 5}_0 ∨ false 
c  in DIMACS:
-21572  21573  21574  0

c  3 does not represent an automaton state.
c    -(-b^{181, 5}_2 ∧  b^{181, 5}_1 ∧  b^{181, 5}_0 ∧ true) 
c  in CNF:
c     b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ false 
c  in DIMACS:
 21572 -21573 -21574  0
c  -3 does not represent an automaton state.
c    -( b^{181, 5}_2 ∧  b^{181, 5}_1 ∧  b^{181, 5}_0 ∧ true) 
c  in CNF:
c    -b^{181, 5}_2 ∨ -b^{181, 5}_1 ∨ -b^{181, 5}_0 ∨ false 
c  in DIMACS:
-21572 -21573 -21574  0

c i = 6
c  -2+1 --> -1
c    ( b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧  p_1086) -> ( b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧  b^{181, 7}_0)
c  in CNF:
c    -b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨  b^{181, 7}_2
c    -b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_1
c    -b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨  b^{181, 7}_0
c  in DIMACS:
-21575 -21576  21577 -1086  21578 0
-21575 -21576  21577 -1086 -21579 0
-21575 -21576  21577 -1086  21580 0

c  -1+1 --> 0
c    ( b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0 ∧  p_1086) -> (-b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧ -b^{181, 7}_0)
c  in CNF:
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_2
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_1
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_0
c  in DIMACS:
-21575  21576 -21577 -1086 -21578 0
-21575  21576 -21577 -1086 -21579 0
-21575  21576 -21577 -1086 -21580 0

c  0+1 --> 1
c    (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧  p_1086) -> (-b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧  b^{181, 7}_0)
c  in CNF:
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_2
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_1
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨  b^{181, 7}_0
c  in DIMACS:
 21575  21576  21577 -1086 -21578 0
 21575  21576  21577 -1086 -21579 0
 21575  21576  21577 -1086  21580 0

c  1+1 --> 2
c    (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0 ∧  p_1086) -> (-b^{181, 7}_2 ∧  b^{181, 7}_1 ∧ -b^{181, 7}_0)
c  in CNF:
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_2
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨  b^{181, 7}_1
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ -p_1086 ∨ -b^{181, 7}_0
c  in DIMACS:
 21575  21576 -21577 -1086 -21578 0
 21575  21576 -21577 -1086  21579 0
 21575  21576 -21577 -1086 -21580 0

c  2+1 --> break 
c    (-b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 21575 -21576  21577 -1086 1162 0


c  2-1 --> 1
c    (-b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧ -p_1086) -> (-b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧  b^{181, 7}_0)
c  in CNF:
c     b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_2
c     b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_1
c     b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨  b^{181, 7}_0
c  in DIMACS:
 21575 -21576  21577  1086 -21578 0
 21575 -21576  21577  1086 -21579 0
 21575 -21576  21577  1086  21580 0

c  1-1 --> 0
c    (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0 ∧ -p_1086) -> (-b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧ -b^{181, 7}_0)
c  in CNF:
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_2
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_1
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_0
c  in DIMACS:
 21575  21576 -21577  1086 -21578 0
 21575  21576 -21577  1086 -21579 0
 21575  21576 -21577  1086 -21580 0

c  0-1 --> -1
c    (-b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧ -p_1086) -> ( b^{181, 7}_2 ∧ -b^{181, 7}_1 ∧  b^{181, 7}_0)
c  in CNF:
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨  b^{181, 7}_2
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_1
c     b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨  b^{181, 7}_0
c  in DIMACS:
 21575  21576  21577  1086  21578 0
 21575  21576  21577  1086 -21579 0
 21575  21576  21577  1086  21580 0

c  -1-1 --> -2
c    ( b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧  b^{181, 6}_0 ∧ -p_1086) -> ( b^{181, 7}_2 ∧  b^{181, 7}_1 ∧ -b^{181, 7}_0)
c  in CNF:
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨  b^{181, 7}_2
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨  b^{181, 7}_1
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨  p_1086 ∨ -b^{181, 7}_0
c  in DIMACS:
-21575  21576 -21577  1086  21578 0
-21575  21576 -21577  1086  21579 0
-21575  21576 -21577  1086 -21580 0

c  -2-1 --> break 
c    ( b^{181, 6}_2 ∧  b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨  b^{181, 6}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-21575 -21576  21577  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{181, 6}_2 ∧ -b^{181, 6}_1 ∧ -b^{181, 6}_0 ∧ true) 
c  in CNF:
c    -b^{181, 6}_2 ∨  b^{181, 6}_1 ∨  b^{181, 6}_0 ∨ false 
c  in DIMACS:
-21575  21576  21577  0

c  3 does not represent an automaton state.
c    -(-b^{181, 6}_2 ∧  b^{181, 6}_1 ∧  b^{181, 6}_0 ∧ true) 
c  in CNF:
c     b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ false 
c  in DIMACS:
 21575 -21576 -21577  0
c  -3 does not represent an automaton state.
c    -( b^{181, 6}_2 ∧  b^{181, 6}_1 ∧  b^{181, 6}_0 ∧ true) 
c  in CNF:
c    -b^{181, 6}_2 ∨ -b^{181, 6}_1 ∨ -b^{181, 6}_0 ∨ false 
c  in DIMACS:
-21575 -21576 -21577  0

c INIT for k = 182
c    -b^{182, 1}_2
c    -b^{182, 1}_1
c    -b^{182, 1}_0
c  in DIMACS:
-21581 0
-21582 0
-21583 0

c Transitions for k = 182
c i = 1
c  -2+1 --> -1
c    ( b^{182, 1}_2 ∧  b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧  p_182) -> ( b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0)
c  in CNF:
c    -b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨  b^{182, 2}_2
c    -b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_1
c    -b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨  b^{182, 2}_0
c  in DIMACS:
-21581 -21582  21583 -182  21584 0
-21581 -21582  21583 -182 -21585 0
-21581 -21582  21583 -182  21586 0

c  -1+1 --> 0
c    ( b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧  b^{182, 1}_0 ∧  p_182) -> (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧ -b^{182, 2}_0)
c  in CNF:
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_2
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_1
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_0
c  in DIMACS:
-21581  21582 -21583 -182 -21584 0
-21581  21582 -21583 -182 -21585 0
-21581  21582 -21583 -182 -21586 0

c  0+1 --> 1
c    (-b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧  p_182) -> (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0)
c  in CNF:
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_2
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_1
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨  b^{182, 2}_0
c  in DIMACS:
 21581  21582  21583 -182 -21584 0
 21581  21582  21583 -182 -21585 0
 21581  21582  21583 -182  21586 0

c  1+1 --> 2
c    (-b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧  b^{182, 1}_0 ∧  p_182) -> (-b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0)
c  in CNF:
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_2
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨  b^{182, 2}_1
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ -p_182 ∨ -b^{182, 2}_0
c  in DIMACS:
 21581  21582 -21583 -182 -21584 0
 21581  21582 -21583 -182  21585 0
 21581  21582 -21583 -182 -21586 0

c  2+1 --> break 
c    (-b^{182, 1}_2 ∧  b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧  p_182) -> break
c  in CNF:
c     b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ -p_182 ∨ break
c  in DIMACS:
 21581 -21582  21583 -182 1162 0


c  2-1 --> 1
c    (-b^{182, 1}_2 ∧  b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧ -p_182) -> (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0)
c  in CNF:
c     b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_2
c     b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_1
c     b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨  b^{182, 2}_0
c  in DIMACS:
 21581 -21582  21583  182 -21584 0
 21581 -21582  21583  182 -21585 0
 21581 -21582  21583  182  21586 0

c  1-1 --> 0
c    (-b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧  b^{182, 1}_0 ∧ -p_182) -> (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧ -b^{182, 2}_0)
c  in CNF:
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_2
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_1
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_0
c  in DIMACS:
 21581  21582 -21583  182 -21584 0
 21581  21582 -21583  182 -21585 0
 21581  21582 -21583  182 -21586 0

c  0-1 --> -1
c    (-b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧ -p_182) -> ( b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0)
c  in CNF:
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨  b^{182, 2}_2
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_1
c     b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨  b^{182, 2}_0
c  in DIMACS:
 21581  21582  21583  182  21584 0
 21581  21582  21583  182 -21585 0
 21581  21582  21583  182  21586 0

c  -1-1 --> -2
c    ( b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧  b^{182, 1}_0 ∧ -p_182) -> ( b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0)
c  in CNF:
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨  b^{182, 2}_2
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨  b^{182, 2}_1
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨  p_182 ∨ -b^{182, 2}_0
c  in DIMACS:
-21581  21582 -21583  182  21584 0
-21581  21582 -21583  182  21585 0
-21581  21582 -21583  182 -21586 0

c  -2-1 --> break 
c    ( b^{182, 1}_2 ∧  b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧ -p_182) -> break
c  in CNF:
c    -b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨  b^{182, 1}_0 ∨  p_182 ∨ break
c  in DIMACS:
-21581 -21582  21583  182 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 1}_2 ∧ -b^{182, 1}_1 ∧ -b^{182, 1}_0 ∧ true) 
c  in CNF:
c    -b^{182, 1}_2 ∨  b^{182, 1}_1 ∨  b^{182, 1}_0 ∨ false 
c  in DIMACS:
-21581  21582  21583  0

c  3 does not represent an automaton state.
c    -(-b^{182, 1}_2 ∧  b^{182, 1}_1 ∧  b^{182, 1}_0 ∧ true) 
c  in CNF:
c     b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ false 
c  in DIMACS:
 21581 -21582 -21583  0
c  -3 does not represent an automaton state.
c    -( b^{182, 1}_2 ∧  b^{182, 1}_1 ∧  b^{182, 1}_0 ∧ true) 
c  in CNF:
c    -b^{182, 1}_2 ∨ -b^{182, 1}_1 ∨ -b^{182, 1}_0 ∨ false 
c  in DIMACS:
-21581 -21582 -21583  0

c i = 2
c  -2+1 --> -1
c    ( b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧  p_364) -> ( b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0)
c  in CNF:
c    -b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨  b^{182, 3}_2
c    -b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_1
c    -b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨  b^{182, 3}_0
c  in DIMACS:
-21584 -21585  21586 -364  21587 0
-21584 -21585  21586 -364 -21588 0
-21584 -21585  21586 -364  21589 0

c  -1+1 --> 0
c    ( b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0 ∧  p_364) -> (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧ -b^{182, 3}_0)
c  in CNF:
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_2
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_1
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_0
c  in DIMACS:
-21584  21585 -21586 -364 -21587 0
-21584  21585 -21586 -364 -21588 0
-21584  21585 -21586 -364 -21589 0

c  0+1 --> 1
c    (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧  p_364) -> (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0)
c  in CNF:
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_2
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_1
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨  b^{182, 3}_0
c  in DIMACS:
 21584  21585  21586 -364 -21587 0
 21584  21585  21586 -364 -21588 0
 21584  21585  21586 -364  21589 0

c  1+1 --> 2
c    (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0 ∧  p_364) -> (-b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0)
c  in CNF:
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_2
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨  b^{182, 3}_1
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ -p_364 ∨ -b^{182, 3}_0
c  in DIMACS:
 21584  21585 -21586 -364 -21587 0
 21584  21585 -21586 -364  21588 0
 21584  21585 -21586 -364 -21589 0

c  2+1 --> break 
c    (-b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧  p_364) -> break
c  in CNF:
c     b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 21584 -21585  21586 -364 1162 0


c  2-1 --> 1
c    (-b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧ -p_364) -> (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0)
c  in CNF:
c     b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_2
c     b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_1
c     b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨  b^{182, 3}_0
c  in DIMACS:
 21584 -21585  21586  364 -21587 0
 21584 -21585  21586  364 -21588 0
 21584 -21585  21586  364  21589 0

c  1-1 --> 0
c    (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0 ∧ -p_364) -> (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧ -b^{182, 3}_0)
c  in CNF:
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_2
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_1
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_0
c  in DIMACS:
 21584  21585 -21586  364 -21587 0
 21584  21585 -21586  364 -21588 0
 21584  21585 -21586  364 -21589 0

c  0-1 --> -1
c    (-b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧ -p_364) -> ( b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0)
c  in CNF:
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨  b^{182, 3}_2
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_1
c     b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨  b^{182, 3}_0
c  in DIMACS:
 21584  21585  21586  364  21587 0
 21584  21585  21586  364 -21588 0
 21584  21585  21586  364  21589 0

c  -1-1 --> -2
c    ( b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧  b^{182, 2}_0 ∧ -p_364) -> ( b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0)
c  in CNF:
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨  b^{182, 3}_2
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨  b^{182, 3}_1
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨  p_364 ∨ -b^{182, 3}_0
c  in DIMACS:
-21584  21585 -21586  364  21587 0
-21584  21585 -21586  364  21588 0
-21584  21585 -21586  364 -21589 0

c  -2-1 --> break 
c    ( b^{182, 2}_2 ∧  b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨  b^{182, 2}_0 ∨  p_364 ∨ break
c  in DIMACS:
-21584 -21585  21586  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 2}_2 ∧ -b^{182, 2}_1 ∧ -b^{182, 2}_0 ∧ true) 
c  in CNF:
c    -b^{182, 2}_2 ∨  b^{182, 2}_1 ∨  b^{182, 2}_0 ∨ false 
c  in DIMACS:
-21584  21585  21586  0

c  3 does not represent an automaton state.
c    -(-b^{182, 2}_2 ∧  b^{182, 2}_1 ∧  b^{182, 2}_0 ∧ true) 
c  in CNF:
c     b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ false 
c  in DIMACS:
 21584 -21585 -21586  0
c  -3 does not represent an automaton state.
c    -( b^{182, 2}_2 ∧  b^{182, 2}_1 ∧  b^{182, 2}_0 ∧ true) 
c  in CNF:
c    -b^{182, 2}_2 ∨ -b^{182, 2}_1 ∨ -b^{182, 2}_0 ∨ false 
c  in DIMACS:
-21584 -21585 -21586  0

c i = 3
c  -2+1 --> -1
c    ( b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧  p_546) -> ( b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0)
c  in CNF:
c    -b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨  b^{182, 4}_2
c    -b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_1
c    -b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨  b^{182, 4}_0
c  in DIMACS:
-21587 -21588  21589 -546  21590 0
-21587 -21588  21589 -546 -21591 0
-21587 -21588  21589 -546  21592 0

c  -1+1 --> 0
c    ( b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0 ∧  p_546) -> (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧ -b^{182, 4}_0)
c  in CNF:
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_2
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_1
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_0
c  in DIMACS:
-21587  21588 -21589 -546 -21590 0
-21587  21588 -21589 -546 -21591 0
-21587  21588 -21589 -546 -21592 0

c  0+1 --> 1
c    (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧  p_546) -> (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0)
c  in CNF:
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_2
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_1
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨  b^{182, 4}_0
c  in DIMACS:
 21587  21588  21589 -546 -21590 0
 21587  21588  21589 -546 -21591 0
 21587  21588  21589 -546  21592 0

c  1+1 --> 2
c    (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0 ∧  p_546) -> (-b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0)
c  in CNF:
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_2
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨  b^{182, 4}_1
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ -p_546 ∨ -b^{182, 4}_0
c  in DIMACS:
 21587  21588 -21589 -546 -21590 0
 21587  21588 -21589 -546  21591 0
 21587  21588 -21589 -546 -21592 0

c  2+1 --> break 
c    (-b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧  p_546) -> break
c  in CNF:
c     b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 21587 -21588  21589 -546 1162 0


c  2-1 --> 1
c    (-b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧ -p_546) -> (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0)
c  in CNF:
c     b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_2
c     b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_1
c     b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨  b^{182, 4}_0
c  in DIMACS:
 21587 -21588  21589  546 -21590 0
 21587 -21588  21589  546 -21591 0
 21587 -21588  21589  546  21592 0

c  1-1 --> 0
c    (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0 ∧ -p_546) -> (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧ -b^{182, 4}_0)
c  in CNF:
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_2
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_1
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_0
c  in DIMACS:
 21587  21588 -21589  546 -21590 0
 21587  21588 -21589  546 -21591 0
 21587  21588 -21589  546 -21592 0

c  0-1 --> -1
c    (-b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧ -p_546) -> ( b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0)
c  in CNF:
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨  b^{182, 4}_2
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_1
c     b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨  b^{182, 4}_0
c  in DIMACS:
 21587  21588  21589  546  21590 0
 21587  21588  21589  546 -21591 0
 21587  21588  21589  546  21592 0

c  -1-1 --> -2
c    ( b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧  b^{182, 3}_0 ∧ -p_546) -> ( b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0)
c  in CNF:
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨  b^{182, 4}_2
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨  b^{182, 4}_1
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨  p_546 ∨ -b^{182, 4}_0
c  in DIMACS:
-21587  21588 -21589  546  21590 0
-21587  21588 -21589  546  21591 0
-21587  21588 -21589  546 -21592 0

c  -2-1 --> break 
c    ( b^{182, 3}_2 ∧  b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨  b^{182, 3}_0 ∨  p_546 ∨ break
c  in DIMACS:
-21587 -21588  21589  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 3}_2 ∧ -b^{182, 3}_1 ∧ -b^{182, 3}_0 ∧ true) 
c  in CNF:
c    -b^{182, 3}_2 ∨  b^{182, 3}_1 ∨  b^{182, 3}_0 ∨ false 
c  in DIMACS:
-21587  21588  21589  0

c  3 does not represent an automaton state.
c    -(-b^{182, 3}_2 ∧  b^{182, 3}_1 ∧  b^{182, 3}_0 ∧ true) 
c  in CNF:
c     b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ false 
c  in DIMACS:
 21587 -21588 -21589  0
c  -3 does not represent an automaton state.
c    -( b^{182, 3}_2 ∧  b^{182, 3}_1 ∧  b^{182, 3}_0 ∧ true) 
c  in CNF:
c    -b^{182, 3}_2 ∨ -b^{182, 3}_1 ∨ -b^{182, 3}_0 ∨ false 
c  in DIMACS:
-21587 -21588 -21589  0

c i = 4
c  -2+1 --> -1
c    ( b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧  p_728) -> ( b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0)
c  in CNF:
c    -b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨  b^{182, 5}_2
c    -b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_1
c    -b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨  b^{182, 5}_0
c  in DIMACS:
-21590 -21591  21592 -728  21593 0
-21590 -21591  21592 -728 -21594 0
-21590 -21591  21592 -728  21595 0

c  -1+1 --> 0
c    ( b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0 ∧  p_728) -> (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧ -b^{182, 5}_0)
c  in CNF:
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_2
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_1
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_0
c  in DIMACS:
-21590  21591 -21592 -728 -21593 0
-21590  21591 -21592 -728 -21594 0
-21590  21591 -21592 -728 -21595 0

c  0+1 --> 1
c    (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧  p_728) -> (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0)
c  in CNF:
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_2
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_1
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨  b^{182, 5}_0
c  in DIMACS:
 21590  21591  21592 -728 -21593 0
 21590  21591  21592 -728 -21594 0
 21590  21591  21592 -728  21595 0

c  1+1 --> 2
c    (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0 ∧  p_728) -> (-b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0)
c  in CNF:
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_2
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨  b^{182, 5}_1
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ -p_728 ∨ -b^{182, 5}_0
c  in DIMACS:
 21590  21591 -21592 -728 -21593 0
 21590  21591 -21592 -728  21594 0
 21590  21591 -21592 -728 -21595 0

c  2+1 --> break 
c    (-b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧  p_728) -> break
c  in CNF:
c     b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 21590 -21591  21592 -728 1162 0


c  2-1 --> 1
c    (-b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧ -p_728) -> (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0)
c  in CNF:
c     b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_2
c     b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_1
c     b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨  b^{182, 5}_0
c  in DIMACS:
 21590 -21591  21592  728 -21593 0
 21590 -21591  21592  728 -21594 0
 21590 -21591  21592  728  21595 0

c  1-1 --> 0
c    (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0 ∧ -p_728) -> (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧ -b^{182, 5}_0)
c  in CNF:
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_2
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_1
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_0
c  in DIMACS:
 21590  21591 -21592  728 -21593 0
 21590  21591 -21592  728 -21594 0
 21590  21591 -21592  728 -21595 0

c  0-1 --> -1
c    (-b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧ -p_728) -> ( b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0)
c  in CNF:
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨  b^{182, 5}_2
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_1
c     b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨  b^{182, 5}_0
c  in DIMACS:
 21590  21591  21592  728  21593 0
 21590  21591  21592  728 -21594 0
 21590  21591  21592  728  21595 0

c  -1-1 --> -2
c    ( b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧  b^{182, 4}_0 ∧ -p_728) -> ( b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0)
c  in CNF:
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨  b^{182, 5}_2
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨  b^{182, 5}_1
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨  p_728 ∨ -b^{182, 5}_0
c  in DIMACS:
-21590  21591 -21592  728  21593 0
-21590  21591 -21592  728  21594 0
-21590  21591 -21592  728 -21595 0

c  -2-1 --> break 
c    ( b^{182, 4}_2 ∧  b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨  b^{182, 4}_0 ∨  p_728 ∨ break
c  in DIMACS:
-21590 -21591  21592  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 4}_2 ∧ -b^{182, 4}_1 ∧ -b^{182, 4}_0 ∧ true) 
c  in CNF:
c    -b^{182, 4}_2 ∨  b^{182, 4}_1 ∨  b^{182, 4}_0 ∨ false 
c  in DIMACS:
-21590  21591  21592  0

c  3 does not represent an automaton state.
c    -(-b^{182, 4}_2 ∧  b^{182, 4}_1 ∧  b^{182, 4}_0 ∧ true) 
c  in CNF:
c     b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ false 
c  in DIMACS:
 21590 -21591 -21592  0
c  -3 does not represent an automaton state.
c    -( b^{182, 4}_2 ∧  b^{182, 4}_1 ∧  b^{182, 4}_0 ∧ true) 
c  in CNF:
c    -b^{182, 4}_2 ∨ -b^{182, 4}_1 ∨ -b^{182, 4}_0 ∨ false 
c  in DIMACS:
-21590 -21591 -21592  0

c i = 5
c  -2+1 --> -1
c    ( b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧  p_910) -> ( b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0)
c  in CNF:
c    -b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨  b^{182, 6}_2
c    -b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_1
c    -b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨  b^{182, 6}_0
c  in DIMACS:
-21593 -21594  21595 -910  21596 0
-21593 -21594  21595 -910 -21597 0
-21593 -21594  21595 -910  21598 0

c  -1+1 --> 0
c    ( b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0 ∧  p_910) -> (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧ -b^{182, 6}_0)
c  in CNF:
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_2
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_1
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_0
c  in DIMACS:
-21593  21594 -21595 -910 -21596 0
-21593  21594 -21595 -910 -21597 0
-21593  21594 -21595 -910 -21598 0

c  0+1 --> 1
c    (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧  p_910) -> (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0)
c  in CNF:
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_2
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_1
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨  b^{182, 6}_0
c  in DIMACS:
 21593  21594  21595 -910 -21596 0
 21593  21594  21595 -910 -21597 0
 21593  21594  21595 -910  21598 0

c  1+1 --> 2
c    (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0 ∧  p_910) -> (-b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0)
c  in CNF:
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_2
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨  b^{182, 6}_1
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ -p_910 ∨ -b^{182, 6}_0
c  in DIMACS:
 21593  21594 -21595 -910 -21596 0
 21593  21594 -21595 -910  21597 0
 21593  21594 -21595 -910 -21598 0

c  2+1 --> break 
c    (-b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧  p_910) -> break
c  in CNF:
c     b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ -p_910 ∨ break
c  in DIMACS:
 21593 -21594  21595 -910 1162 0


c  2-1 --> 1
c    (-b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧ -p_910) -> (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0)
c  in CNF:
c     b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_2
c     b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_1
c     b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨  b^{182, 6}_0
c  in DIMACS:
 21593 -21594  21595  910 -21596 0
 21593 -21594  21595  910 -21597 0
 21593 -21594  21595  910  21598 0

c  1-1 --> 0
c    (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0 ∧ -p_910) -> (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧ -b^{182, 6}_0)
c  in CNF:
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_2
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_1
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_0
c  in DIMACS:
 21593  21594 -21595  910 -21596 0
 21593  21594 -21595  910 -21597 0
 21593  21594 -21595  910 -21598 0

c  0-1 --> -1
c    (-b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧ -p_910) -> ( b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0)
c  in CNF:
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨  b^{182, 6}_2
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_1
c     b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨  b^{182, 6}_0
c  in DIMACS:
 21593  21594  21595  910  21596 0
 21593  21594  21595  910 -21597 0
 21593  21594  21595  910  21598 0

c  -1-1 --> -2
c    ( b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧  b^{182, 5}_0 ∧ -p_910) -> ( b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0)
c  in CNF:
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨  b^{182, 6}_2
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨  b^{182, 6}_1
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨  p_910 ∨ -b^{182, 6}_0
c  in DIMACS:
-21593  21594 -21595  910  21596 0
-21593  21594 -21595  910  21597 0
-21593  21594 -21595  910 -21598 0

c  -2-1 --> break 
c    ( b^{182, 5}_2 ∧  b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧ -p_910) -> break
c  in CNF:
c    -b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨  b^{182, 5}_0 ∨  p_910 ∨ break
c  in DIMACS:
-21593 -21594  21595  910 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 5}_2 ∧ -b^{182, 5}_1 ∧ -b^{182, 5}_0 ∧ true) 
c  in CNF:
c    -b^{182, 5}_2 ∨  b^{182, 5}_1 ∨  b^{182, 5}_0 ∨ false 
c  in DIMACS:
-21593  21594  21595  0

c  3 does not represent an automaton state.
c    -(-b^{182, 5}_2 ∧  b^{182, 5}_1 ∧  b^{182, 5}_0 ∧ true) 
c  in CNF:
c     b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ false 
c  in DIMACS:
 21593 -21594 -21595  0
c  -3 does not represent an automaton state.
c    -( b^{182, 5}_2 ∧  b^{182, 5}_1 ∧  b^{182, 5}_0 ∧ true) 
c  in CNF:
c    -b^{182, 5}_2 ∨ -b^{182, 5}_1 ∨ -b^{182, 5}_0 ∨ false 
c  in DIMACS:
-21593 -21594 -21595  0

c i = 6
c  -2+1 --> -1
c    ( b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧  p_1092) -> ( b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧  b^{182, 7}_0)
c  in CNF:
c    -b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨  b^{182, 7}_2
c    -b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_1
c    -b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨  b^{182, 7}_0
c  in DIMACS:
-21596 -21597  21598 -1092  21599 0
-21596 -21597  21598 -1092 -21600 0
-21596 -21597  21598 -1092  21601 0

c  -1+1 --> 0
c    ( b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0 ∧  p_1092) -> (-b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧ -b^{182, 7}_0)
c  in CNF:
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_2
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_1
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_0
c  in DIMACS:
-21596  21597 -21598 -1092 -21599 0
-21596  21597 -21598 -1092 -21600 0
-21596  21597 -21598 -1092 -21601 0

c  0+1 --> 1
c    (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧  p_1092) -> (-b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧  b^{182, 7}_0)
c  in CNF:
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_2
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_1
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨  b^{182, 7}_0
c  in DIMACS:
 21596  21597  21598 -1092 -21599 0
 21596  21597  21598 -1092 -21600 0
 21596  21597  21598 -1092  21601 0

c  1+1 --> 2
c    (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0 ∧  p_1092) -> (-b^{182, 7}_2 ∧  b^{182, 7}_1 ∧ -b^{182, 7}_0)
c  in CNF:
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_2
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨  b^{182, 7}_1
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ -p_1092 ∨ -b^{182, 7}_0
c  in DIMACS:
 21596  21597 -21598 -1092 -21599 0
 21596  21597 -21598 -1092  21600 0
 21596  21597 -21598 -1092 -21601 0

c  2+1 --> break 
c    (-b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 21596 -21597  21598 -1092 1162 0


c  2-1 --> 1
c    (-b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧ -p_1092) -> (-b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧  b^{182, 7}_0)
c  in CNF:
c     b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_2
c     b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_1
c     b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨  b^{182, 7}_0
c  in DIMACS:
 21596 -21597  21598  1092 -21599 0
 21596 -21597  21598  1092 -21600 0
 21596 -21597  21598  1092  21601 0

c  1-1 --> 0
c    (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0 ∧ -p_1092) -> (-b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧ -b^{182, 7}_0)
c  in CNF:
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_2
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_1
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_0
c  in DIMACS:
 21596  21597 -21598  1092 -21599 0
 21596  21597 -21598  1092 -21600 0
 21596  21597 -21598  1092 -21601 0

c  0-1 --> -1
c    (-b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧ -p_1092) -> ( b^{182, 7}_2 ∧ -b^{182, 7}_1 ∧  b^{182, 7}_0)
c  in CNF:
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨  b^{182, 7}_2
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_1
c     b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨  b^{182, 7}_0
c  in DIMACS:
 21596  21597  21598  1092  21599 0
 21596  21597  21598  1092 -21600 0
 21596  21597  21598  1092  21601 0

c  -1-1 --> -2
c    ( b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧  b^{182, 6}_0 ∧ -p_1092) -> ( b^{182, 7}_2 ∧  b^{182, 7}_1 ∧ -b^{182, 7}_0)
c  in CNF:
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨  b^{182, 7}_2
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨  b^{182, 7}_1
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨  p_1092 ∨ -b^{182, 7}_0
c  in DIMACS:
-21596  21597 -21598  1092  21599 0
-21596  21597 -21598  1092  21600 0
-21596  21597 -21598  1092 -21601 0

c  -2-1 --> break 
c    ( b^{182, 6}_2 ∧  b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨  b^{182, 6}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-21596 -21597  21598  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{182, 6}_2 ∧ -b^{182, 6}_1 ∧ -b^{182, 6}_0 ∧ true) 
c  in CNF:
c    -b^{182, 6}_2 ∨  b^{182, 6}_1 ∨  b^{182, 6}_0 ∨ false 
c  in DIMACS:
-21596  21597  21598  0

c  3 does not represent an automaton state.
c    -(-b^{182, 6}_2 ∧  b^{182, 6}_1 ∧  b^{182, 6}_0 ∧ true) 
c  in CNF:
c     b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ false 
c  in DIMACS:
 21596 -21597 -21598  0
c  -3 does not represent an automaton state.
c    -( b^{182, 6}_2 ∧  b^{182, 6}_1 ∧  b^{182, 6}_0 ∧ true) 
c  in CNF:
c    -b^{182, 6}_2 ∨ -b^{182, 6}_1 ∨ -b^{182, 6}_0 ∨ false 
c  in DIMACS:
-21596 -21597 -21598  0

c INIT for k = 183
c    -b^{183, 1}_2
c    -b^{183, 1}_1
c    -b^{183, 1}_0
c  in DIMACS:
-21602 0
-21603 0
-21604 0

c Transitions for k = 183
c i = 1
c  -2+1 --> -1
c    ( b^{183, 1}_2 ∧  b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧  p_183) -> ( b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0)
c  in CNF:
c    -b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨  b^{183, 2}_2
c    -b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_1
c    -b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨  b^{183, 2}_0
c  in DIMACS:
-21602 -21603  21604 -183  21605 0
-21602 -21603  21604 -183 -21606 0
-21602 -21603  21604 -183  21607 0

c  -1+1 --> 0
c    ( b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧  b^{183, 1}_0 ∧  p_183) -> (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧ -b^{183, 2}_0)
c  in CNF:
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_2
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_1
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_0
c  in DIMACS:
-21602  21603 -21604 -183 -21605 0
-21602  21603 -21604 -183 -21606 0
-21602  21603 -21604 -183 -21607 0

c  0+1 --> 1
c    (-b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧  p_183) -> (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0)
c  in CNF:
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_2
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_1
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨  b^{183, 2}_0
c  in DIMACS:
 21602  21603  21604 -183 -21605 0
 21602  21603  21604 -183 -21606 0
 21602  21603  21604 -183  21607 0

c  1+1 --> 2
c    (-b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧  b^{183, 1}_0 ∧  p_183) -> (-b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0)
c  in CNF:
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_2
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨  b^{183, 2}_1
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ -p_183 ∨ -b^{183, 2}_0
c  in DIMACS:
 21602  21603 -21604 -183 -21605 0
 21602  21603 -21604 -183  21606 0
 21602  21603 -21604 -183 -21607 0

c  2+1 --> break 
c    (-b^{183, 1}_2 ∧  b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧  p_183) -> break
c  in CNF:
c     b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ -p_183 ∨ break
c  in DIMACS:
 21602 -21603  21604 -183 1162 0


c  2-1 --> 1
c    (-b^{183, 1}_2 ∧  b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧ -p_183) -> (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0)
c  in CNF:
c     b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_2
c     b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_1
c     b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨  b^{183, 2}_0
c  in DIMACS:
 21602 -21603  21604  183 -21605 0
 21602 -21603  21604  183 -21606 0
 21602 -21603  21604  183  21607 0

c  1-1 --> 0
c    (-b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧  b^{183, 1}_0 ∧ -p_183) -> (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧ -b^{183, 2}_0)
c  in CNF:
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_2
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_1
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_0
c  in DIMACS:
 21602  21603 -21604  183 -21605 0
 21602  21603 -21604  183 -21606 0
 21602  21603 -21604  183 -21607 0

c  0-1 --> -1
c    (-b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧ -p_183) -> ( b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0)
c  in CNF:
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨  b^{183, 2}_2
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_1
c     b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨  b^{183, 2}_0
c  in DIMACS:
 21602  21603  21604  183  21605 0
 21602  21603  21604  183 -21606 0
 21602  21603  21604  183  21607 0

c  -1-1 --> -2
c    ( b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧  b^{183, 1}_0 ∧ -p_183) -> ( b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0)
c  in CNF:
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨  b^{183, 2}_2
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨  b^{183, 2}_1
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨  p_183 ∨ -b^{183, 2}_0
c  in DIMACS:
-21602  21603 -21604  183  21605 0
-21602  21603 -21604  183  21606 0
-21602  21603 -21604  183 -21607 0

c  -2-1 --> break 
c    ( b^{183, 1}_2 ∧  b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧ -p_183) -> break
c  in CNF:
c    -b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨  b^{183, 1}_0 ∨  p_183 ∨ break
c  in DIMACS:
-21602 -21603  21604  183 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 1}_2 ∧ -b^{183, 1}_1 ∧ -b^{183, 1}_0 ∧ true) 
c  in CNF:
c    -b^{183, 1}_2 ∨  b^{183, 1}_1 ∨  b^{183, 1}_0 ∨ false 
c  in DIMACS:
-21602  21603  21604  0

c  3 does not represent an automaton state.
c    -(-b^{183, 1}_2 ∧  b^{183, 1}_1 ∧  b^{183, 1}_0 ∧ true) 
c  in CNF:
c     b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ false 
c  in DIMACS:
 21602 -21603 -21604  0
c  -3 does not represent an automaton state.
c    -( b^{183, 1}_2 ∧  b^{183, 1}_1 ∧  b^{183, 1}_0 ∧ true) 
c  in CNF:
c    -b^{183, 1}_2 ∨ -b^{183, 1}_1 ∨ -b^{183, 1}_0 ∨ false 
c  in DIMACS:
-21602 -21603 -21604  0

c i = 2
c  -2+1 --> -1
c    ( b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧  p_366) -> ( b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0)
c  in CNF:
c    -b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨  b^{183, 3}_2
c    -b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_1
c    -b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨  b^{183, 3}_0
c  in DIMACS:
-21605 -21606  21607 -366  21608 0
-21605 -21606  21607 -366 -21609 0
-21605 -21606  21607 -366  21610 0

c  -1+1 --> 0
c    ( b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0 ∧  p_366) -> (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧ -b^{183, 3}_0)
c  in CNF:
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_2
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_1
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_0
c  in DIMACS:
-21605  21606 -21607 -366 -21608 0
-21605  21606 -21607 -366 -21609 0
-21605  21606 -21607 -366 -21610 0

c  0+1 --> 1
c    (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧  p_366) -> (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0)
c  in CNF:
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_2
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_1
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨  b^{183, 3}_0
c  in DIMACS:
 21605  21606  21607 -366 -21608 0
 21605  21606  21607 -366 -21609 0
 21605  21606  21607 -366  21610 0

c  1+1 --> 2
c    (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0 ∧  p_366) -> (-b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0)
c  in CNF:
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_2
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨  b^{183, 3}_1
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ -p_366 ∨ -b^{183, 3}_0
c  in DIMACS:
 21605  21606 -21607 -366 -21608 0
 21605  21606 -21607 -366  21609 0
 21605  21606 -21607 -366 -21610 0

c  2+1 --> break 
c    (-b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧  p_366) -> break
c  in CNF:
c     b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 21605 -21606  21607 -366 1162 0


c  2-1 --> 1
c    (-b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧ -p_366) -> (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0)
c  in CNF:
c     b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_2
c     b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_1
c     b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨  b^{183, 3}_0
c  in DIMACS:
 21605 -21606  21607  366 -21608 0
 21605 -21606  21607  366 -21609 0
 21605 -21606  21607  366  21610 0

c  1-1 --> 0
c    (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0 ∧ -p_366) -> (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧ -b^{183, 3}_0)
c  in CNF:
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_2
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_1
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_0
c  in DIMACS:
 21605  21606 -21607  366 -21608 0
 21605  21606 -21607  366 -21609 0
 21605  21606 -21607  366 -21610 0

c  0-1 --> -1
c    (-b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧ -p_366) -> ( b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0)
c  in CNF:
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨  b^{183, 3}_2
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_1
c     b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨  b^{183, 3}_0
c  in DIMACS:
 21605  21606  21607  366  21608 0
 21605  21606  21607  366 -21609 0
 21605  21606  21607  366  21610 0

c  -1-1 --> -2
c    ( b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧  b^{183, 2}_0 ∧ -p_366) -> ( b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0)
c  in CNF:
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨  b^{183, 3}_2
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨  b^{183, 3}_1
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨  p_366 ∨ -b^{183, 3}_0
c  in DIMACS:
-21605  21606 -21607  366  21608 0
-21605  21606 -21607  366  21609 0
-21605  21606 -21607  366 -21610 0

c  -2-1 --> break 
c    ( b^{183, 2}_2 ∧  b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨  b^{183, 2}_0 ∨  p_366 ∨ break
c  in DIMACS:
-21605 -21606  21607  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 2}_2 ∧ -b^{183, 2}_1 ∧ -b^{183, 2}_0 ∧ true) 
c  in CNF:
c    -b^{183, 2}_2 ∨  b^{183, 2}_1 ∨  b^{183, 2}_0 ∨ false 
c  in DIMACS:
-21605  21606  21607  0

c  3 does not represent an automaton state.
c    -(-b^{183, 2}_2 ∧  b^{183, 2}_1 ∧  b^{183, 2}_0 ∧ true) 
c  in CNF:
c     b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ false 
c  in DIMACS:
 21605 -21606 -21607  0
c  -3 does not represent an automaton state.
c    -( b^{183, 2}_2 ∧  b^{183, 2}_1 ∧  b^{183, 2}_0 ∧ true) 
c  in CNF:
c    -b^{183, 2}_2 ∨ -b^{183, 2}_1 ∨ -b^{183, 2}_0 ∨ false 
c  in DIMACS:
-21605 -21606 -21607  0

c i = 3
c  -2+1 --> -1
c    ( b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧  p_549) -> ( b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0)
c  in CNF:
c    -b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨  b^{183, 4}_2
c    -b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_1
c    -b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨  b^{183, 4}_0
c  in DIMACS:
-21608 -21609  21610 -549  21611 0
-21608 -21609  21610 -549 -21612 0
-21608 -21609  21610 -549  21613 0

c  -1+1 --> 0
c    ( b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0 ∧  p_549) -> (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧ -b^{183, 4}_0)
c  in CNF:
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_2
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_1
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_0
c  in DIMACS:
-21608  21609 -21610 -549 -21611 0
-21608  21609 -21610 -549 -21612 0
-21608  21609 -21610 -549 -21613 0

c  0+1 --> 1
c    (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧  p_549) -> (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0)
c  in CNF:
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_2
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_1
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨  b^{183, 4}_0
c  in DIMACS:
 21608  21609  21610 -549 -21611 0
 21608  21609  21610 -549 -21612 0
 21608  21609  21610 -549  21613 0

c  1+1 --> 2
c    (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0 ∧  p_549) -> (-b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0)
c  in CNF:
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_2
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨  b^{183, 4}_1
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ -p_549 ∨ -b^{183, 4}_0
c  in DIMACS:
 21608  21609 -21610 -549 -21611 0
 21608  21609 -21610 -549  21612 0
 21608  21609 -21610 -549 -21613 0

c  2+1 --> break 
c    (-b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧  p_549) -> break
c  in CNF:
c     b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ -p_549 ∨ break
c  in DIMACS:
 21608 -21609  21610 -549 1162 0


c  2-1 --> 1
c    (-b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧ -p_549) -> (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0)
c  in CNF:
c     b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_2
c     b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_1
c     b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨  b^{183, 4}_0
c  in DIMACS:
 21608 -21609  21610  549 -21611 0
 21608 -21609  21610  549 -21612 0
 21608 -21609  21610  549  21613 0

c  1-1 --> 0
c    (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0 ∧ -p_549) -> (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧ -b^{183, 4}_0)
c  in CNF:
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_2
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_1
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_0
c  in DIMACS:
 21608  21609 -21610  549 -21611 0
 21608  21609 -21610  549 -21612 0
 21608  21609 -21610  549 -21613 0

c  0-1 --> -1
c    (-b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧ -p_549) -> ( b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0)
c  in CNF:
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨  b^{183, 4}_2
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_1
c     b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨  b^{183, 4}_0
c  in DIMACS:
 21608  21609  21610  549  21611 0
 21608  21609  21610  549 -21612 0
 21608  21609  21610  549  21613 0

c  -1-1 --> -2
c    ( b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧  b^{183, 3}_0 ∧ -p_549) -> ( b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0)
c  in CNF:
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨  b^{183, 4}_2
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨  b^{183, 4}_1
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨  p_549 ∨ -b^{183, 4}_0
c  in DIMACS:
-21608  21609 -21610  549  21611 0
-21608  21609 -21610  549  21612 0
-21608  21609 -21610  549 -21613 0

c  -2-1 --> break 
c    ( b^{183, 3}_2 ∧  b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧ -p_549) -> break
c  in CNF:
c    -b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨  b^{183, 3}_0 ∨  p_549 ∨ break
c  in DIMACS:
-21608 -21609  21610  549 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 3}_2 ∧ -b^{183, 3}_1 ∧ -b^{183, 3}_0 ∧ true) 
c  in CNF:
c    -b^{183, 3}_2 ∨  b^{183, 3}_1 ∨  b^{183, 3}_0 ∨ false 
c  in DIMACS:
-21608  21609  21610  0

c  3 does not represent an automaton state.
c    -(-b^{183, 3}_2 ∧  b^{183, 3}_1 ∧  b^{183, 3}_0 ∧ true) 
c  in CNF:
c     b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ false 
c  in DIMACS:
 21608 -21609 -21610  0
c  -3 does not represent an automaton state.
c    -( b^{183, 3}_2 ∧  b^{183, 3}_1 ∧  b^{183, 3}_0 ∧ true) 
c  in CNF:
c    -b^{183, 3}_2 ∨ -b^{183, 3}_1 ∨ -b^{183, 3}_0 ∨ false 
c  in DIMACS:
-21608 -21609 -21610  0

c i = 4
c  -2+1 --> -1
c    ( b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧  p_732) -> ( b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0)
c  in CNF:
c    -b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨  b^{183, 5}_2
c    -b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_1
c    -b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨  b^{183, 5}_0
c  in DIMACS:
-21611 -21612  21613 -732  21614 0
-21611 -21612  21613 -732 -21615 0
-21611 -21612  21613 -732  21616 0

c  -1+1 --> 0
c    ( b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0 ∧  p_732) -> (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧ -b^{183, 5}_0)
c  in CNF:
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_2
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_1
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_0
c  in DIMACS:
-21611  21612 -21613 -732 -21614 0
-21611  21612 -21613 -732 -21615 0
-21611  21612 -21613 -732 -21616 0

c  0+1 --> 1
c    (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧  p_732) -> (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0)
c  in CNF:
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_2
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_1
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨  b^{183, 5}_0
c  in DIMACS:
 21611  21612  21613 -732 -21614 0
 21611  21612  21613 -732 -21615 0
 21611  21612  21613 -732  21616 0

c  1+1 --> 2
c    (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0 ∧  p_732) -> (-b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0)
c  in CNF:
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_2
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨  b^{183, 5}_1
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ -p_732 ∨ -b^{183, 5}_0
c  in DIMACS:
 21611  21612 -21613 -732 -21614 0
 21611  21612 -21613 -732  21615 0
 21611  21612 -21613 -732 -21616 0

c  2+1 --> break 
c    (-b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧  p_732) -> break
c  in CNF:
c     b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 21611 -21612  21613 -732 1162 0


c  2-1 --> 1
c    (-b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧ -p_732) -> (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0)
c  in CNF:
c     b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_2
c     b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_1
c     b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨  b^{183, 5}_0
c  in DIMACS:
 21611 -21612  21613  732 -21614 0
 21611 -21612  21613  732 -21615 0
 21611 -21612  21613  732  21616 0

c  1-1 --> 0
c    (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0 ∧ -p_732) -> (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧ -b^{183, 5}_0)
c  in CNF:
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_2
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_1
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_0
c  in DIMACS:
 21611  21612 -21613  732 -21614 0
 21611  21612 -21613  732 -21615 0
 21611  21612 -21613  732 -21616 0

c  0-1 --> -1
c    (-b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧ -p_732) -> ( b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0)
c  in CNF:
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨  b^{183, 5}_2
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_1
c     b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨  b^{183, 5}_0
c  in DIMACS:
 21611  21612  21613  732  21614 0
 21611  21612  21613  732 -21615 0
 21611  21612  21613  732  21616 0

c  -1-1 --> -2
c    ( b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧  b^{183, 4}_0 ∧ -p_732) -> ( b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0)
c  in CNF:
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨  b^{183, 5}_2
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨  b^{183, 5}_1
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨  p_732 ∨ -b^{183, 5}_0
c  in DIMACS:
-21611  21612 -21613  732  21614 0
-21611  21612 -21613  732  21615 0
-21611  21612 -21613  732 -21616 0

c  -2-1 --> break 
c    ( b^{183, 4}_2 ∧  b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨  b^{183, 4}_0 ∨  p_732 ∨ break
c  in DIMACS:
-21611 -21612  21613  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 4}_2 ∧ -b^{183, 4}_1 ∧ -b^{183, 4}_0 ∧ true) 
c  in CNF:
c    -b^{183, 4}_2 ∨  b^{183, 4}_1 ∨  b^{183, 4}_0 ∨ false 
c  in DIMACS:
-21611  21612  21613  0

c  3 does not represent an automaton state.
c    -(-b^{183, 4}_2 ∧  b^{183, 4}_1 ∧  b^{183, 4}_0 ∧ true) 
c  in CNF:
c     b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ false 
c  in DIMACS:
 21611 -21612 -21613  0
c  -3 does not represent an automaton state.
c    -( b^{183, 4}_2 ∧  b^{183, 4}_1 ∧  b^{183, 4}_0 ∧ true) 
c  in CNF:
c    -b^{183, 4}_2 ∨ -b^{183, 4}_1 ∨ -b^{183, 4}_0 ∨ false 
c  in DIMACS:
-21611 -21612 -21613  0

c i = 5
c  -2+1 --> -1
c    ( b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧  p_915) -> ( b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0)
c  in CNF:
c    -b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨  b^{183, 6}_2
c    -b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_1
c    -b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨  b^{183, 6}_0
c  in DIMACS:
-21614 -21615  21616 -915  21617 0
-21614 -21615  21616 -915 -21618 0
-21614 -21615  21616 -915  21619 0

c  -1+1 --> 0
c    ( b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0 ∧  p_915) -> (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧ -b^{183, 6}_0)
c  in CNF:
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_2
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_1
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_0
c  in DIMACS:
-21614  21615 -21616 -915 -21617 0
-21614  21615 -21616 -915 -21618 0
-21614  21615 -21616 -915 -21619 0

c  0+1 --> 1
c    (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧  p_915) -> (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0)
c  in CNF:
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_2
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_1
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨  b^{183, 6}_0
c  in DIMACS:
 21614  21615  21616 -915 -21617 0
 21614  21615  21616 -915 -21618 0
 21614  21615  21616 -915  21619 0

c  1+1 --> 2
c    (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0 ∧  p_915) -> (-b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0)
c  in CNF:
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_2
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨  b^{183, 6}_1
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ -p_915 ∨ -b^{183, 6}_0
c  in DIMACS:
 21614  21615 -21616 -915 -21617 0
 21614  21615 -21616 -915  21618 0
 21614  21615 -21616 -915 -21619 0

c  2+1 --> break 
c    (-b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧  p_915) -> break
c  in CNF:
c     b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 21614 -21615  21616 -915 1162 0


c  2-1 --> 1
c    (-b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧ -p_915) -> (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0)
c  in CNF:
c     b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_2
c     b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_1
c     b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨  b^{183, 6}_0
c  in DIMACS:
 21614 -21615  21616  915 -21617 0
 21614 -21615  21616  915 -21618 0
 21614 -21615  21616  915  21619 0

c  1-1 --> 0
c    (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0 ∧ -p_915) -> (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧ -b^{183, 6}_0)
c  in CNF:
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_2
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_1
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_0
c  in DIMACS:
 21614  21615 -21616  915 -21617 0
 21614  21615 -21616  915 -21618 0
 21614  21615 -21616  915 -21619 0

c  0-1 --> -1
c    (-b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧ -p_915) -> ( b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0)
c  in CNF:
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨  b^{183, 6}_2
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_1
c     b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨  b^{183, 6}_0
c  in DIMACS:
 21614  21615  21616  915  21617 0
 21614  21615  21616  915 -21618 0
 21614  21615  21616  915  21619 0

c  -1-1 --> -2
c    ( b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧  b^{183, 5}_0 ∧ -p_915) -> ( b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0)
c  in CNF:
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨  b^{183, 6}_2
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨  b^{183, 6}_1
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨  p_915 ∨ -b^{183, 6}_0
c  in DIMACS:
-21614  21615 -21616  915  21617 0
-21614  21615 -21616  915  21618 0
-21614  21615 -21616  915 -21619 0

c  -2-1 --> break 
c    ( b^{183, 5}_2 ∧  b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨  b^{183, 5}_0 ∨  p_915 ∨ break
c  in DIMACS:
-21614 -21615  21616  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 5}_2 ∧ -b^{183, 5}_1 ∧ -b^{183, 5}_0 ∧ true) 
c  in CNF:
c    -b^{183, 5}_2 ∨  b^{183, 5}_1 ∨  b^{183, 5}_0 ∨ false 
c  in DIMACS:
-21614  21615  21616  0

c  3 does not represent an automaton state.
c    -(-b^{183, 5}_2 ∧  b^{183, 5}_1 ∧  b^{183, 5}_0 ∧ true) 
c  in CNF:
c     b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ false 
c  in DIMACS:
 21614 -21615 -21616  0
c  -3 does not represent an automaton state.
c    -( b^{183, 5}_2 ∧  b^{183, 5}_1 ∧  b^{183, 5}_0 ∧ true) 
c  in CNF:
c    -b^{183, 5}_2 ∨ -b^{183, 5}_1 ∨ -b^{183, 5}_0 ∨ false 
c  in DIMACS:
-21614 -21615 -21616  0

c i = 6
c  -2+1 --> -1
c    ( b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧  p_1098) -> ( b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧  b^{183, 7}_0)
c  in CNF:
c    -b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨  b^{183, 7}_2
c    -b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_1
c    -b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨  b^{183, 7}_0
c  in DIMACS:
-21617 -21618  21619 -1098  21620 0
-21617 -21618  21619 -1098 -21621 0
-21617 -21618  21619 -1098  21622 0

c  -1+1 --> 0
c    ( b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0 ∧  p_1098) -> (-b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧ -b^{183, 7}_0)
c  in CNF:
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_2
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_1
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_0
c  in DIMACS:
-21617  21618 -21619 -1098 -21620 0
-21617  21618 -21619 -1098 -21621 0
-21617  21618 -21619 -1098 -21622 0

c  0+1 --> 1
c    (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧  p_1098) -> (-b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧  b^{183, 7}_0)
c  in CNF:
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_2
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_1
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨  b^{183, 7}_0
c  in DIMACS:
 21617  21618  21619 -1098 -21620 0
 21617  21618  21619 -1098 -21621 0
 21617  21618  21619 -1098  21622 0

c  1+1 --> 2
c    (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0 ∧  p_1098) -> (-b^{183, 7}_2 ∧  b^{183, 7}_1 ∧ -b^{183, 7}_0)
c  in CNF:
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_2
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨  b^{183, 7}_1
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ -p_1098 ∨ -b^{183, 7}_0
c  in DIMACS:
 21617  21618 -21619 -1098 -21620 0
 21617  21618 -21619 -1098  21621 0
 21617  21618 -21619 -1098 -21622 0

c  2+1 --> break 
c    (-b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 21617 -21618  21619 -1098 1162 0


c  2-1 --> 1
c    (-b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧ -p_1098) -> (-b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧  b^{183, 7}_0)
c  in CNF:
c     b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_2
c     b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_1
c     b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨  b^{183, 7}_0
c  in DIMACS:
 21617 -21618  21619  1098 -21620 0
 21617 -21618  21619  1098 -21621 0
 21617 -21618  21619  1098  21622 0

c  1-1 --> 0
c    (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0 ∧ -p_1098) -> (-b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧ -b^{183, 7}_0)
c  in CNF:
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_2
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_1
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_0
c  in DIMACS:
 21617  21618 -21619  1098 -21620 0
 21617  21618 -21619  1098 -21621 0
 21617  21618 -21619  1098 -21622 0

c  0-1 --> -1
c    (-b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧ -p_1098) -> ( b^{183, 7}_2 ∧ -b^{183, 7}_1 ∧  b^{183, 7}_0)
c  in CNF:
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨  b^{183, 7}_2
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_1
c     b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨  b^{183, 7}_0
c  in DIMACS:
 21617  21618  21619  1098  21620 0
 21617  21618  21619  1098 -21621 0
 21617  21618  21619  1098  21622 0

c  -1-1 --> -2
c    ( b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧  b^{183, 6}_0 ∧ -p_1098) -> ( b^{183, 7}_2 ∧  b^{183, 7}_1 ∧ -b^{183, 7}_0)
c  in CNF:
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨  b^{183, 7}_2
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨  b^{183, 7}_1
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨  p_1098 ∨ -b^{183, 7}_0
c  in DIMACS:
-21617  21618 -21619  1098  21620 0
-21617  21618 -21619  1098  21621 0
-21617  21618 -21619  1098 -21622 0

c  -2-1 --> break 
c    ( b^{183, 6}_2 ∧  b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨  b^{183, 6}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-21617 -21618  21619  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{183, 6}_2 ∧ -b^{183, 6}_1 ∧ -b^{183, 6}_0 ∧ true) 
c  in CNF:
c    -b^{183, 6}_2 ∨  b^{183, 6}_1 ∨  b^{183, 6}_0 ∨ false 
c  in DIMACS:
-21617  21618  21619  0

c  3 does not represent an automaton state.
c    -(-b^{183, 6}_2 ∧  b^{183, 6}_1 ∧  b^{183, 6}_0 ∧ true) 
c  in CNF:
c     b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ false 
c  in DIMACS:
 21617 -21618 -21619  0
c  -3 does not represent an automaton state.
c    -( b^{183, 6}_2 ∧  b^{183, 6}_1 ∧  b^{183, 6}_0 ∧ true) 
c  in CNF:
c    -b^{183, 6}_2 ∨ -b^{183, 6}_1 ∨ -b^{183, 6}_0 ∨ false 
c  in DIMACS:
-21617 -21618 -21619  0

c INIT for k = 184
c    -b^{184, 1}_2
c    -b^{184, 1}_1
c    -b^{184, 1}_0
c  in DIMACS:
-21623 0
-21624 0
-21625 0

c Transitions for k = 184
c i = 1
c  -2+1 --> -1
c    ( b^{184, 1}_2 ∧  b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧  p_184) -> ( b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0)
c  in CNF:
c    -b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨  b^{184, 2}_2
c    -b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_1
c    -b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨  b^{184, 2}_0
c  in DIMACS:
-21623 -21624  21625 -184  21626 0
-21623 -21624  21625 -184 -21627 0
-21623 -21624  21625 -184  21628 0

c  -1+1 --> 0
c    ( b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧  b^{184, 1}_0 ∧  p_184) -> (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧ -b^{184, 2}_0)
c  in CNF:
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_2
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_1
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_0
c  in DIMACS:
-21623  21624 -21625 -184 -21626 0
-21623  21624 -21625 -184 -21627 0
-21623  21624 -21625 -184 -21628 0

c  0+1 --> 1
c    (-b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧  p_184) -> (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0)
c  in CNF:
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_2
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_1
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨  b^{184, 2}_0
c  in DIMACS:
 21623  21624  21625 -184 -21626 0
 21623  21624  21625 -184 -21627 0
 21623  21624  21625 -184  21628 0

c  1+1 --> 2
c    (-b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧  b^{184, 1}_0 ∧  p_184) -> (-b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0)
c  in CNF:
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_2
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨  b^{184, 2}_1
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ -p_184 ∨ -b^{184, 2}_0
c  in DIMACS:
 21623  21624 -21625 -184 -21626 0
 21623  21624 -21625 -184  21627 0
 21623  21624 -21625 -184 -21628 0

c  2+1 --> break 
c    (-b^{184, 1}_2 ∧  b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧  p_184) -> break
c  in CNF:
c     b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ -p_184 ∨ break
c  in DIMACS:
 21623 -21624  21625 -184 1162 0


c  2-1 --> 1
c    (-b^{184, 1}_2 ∧  b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧ -p_184) -> (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0)
c  in CNF:
c     b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_2
c     b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_1
c     b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨  b^{184, 2}_0
c  in DIMACS:
 21623 -21624  21625  184 -21626 0
 21623 -21624  21625  184 -21627 0
 21623 -21624  21625  184  21628 0

c  1-1 --> 0
c    (-b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧  b^{184, 1}_0 ∧ -p_184) -> (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧ -b^{184, 2}_0)
c  in CNF:
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_2
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_1
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_0
c  in DIMACS:
 21623  21624 -21625  184 -21626 0
 21623  21624 -21625  184 -21627 0
 21623  21624 -21625  184 -21628 0

c  0-1 --> -1
c    (-b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧ -p_184) -> ( b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0)
c  in CNF:
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨  b^{184, 2}_2
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_1
c     b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨  b^{184, 2}_0
c  in DIMACS:
 21623  21624  21625  184  21626 0
 21623  21624  21625  184 -21627 0
 21623  21624  21625  184  21628 0

c  -1-1 --> -2
c    ( b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧  b^{184, 1}_0 ∧ -p_184) -> ( b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0)
c  in CNF:
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨  b^{184, 2}_2
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨  b^{184, 2}_1
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨  p_184 ∨ -b^{184, 2}_0
c  in DIMACS:
-21623  21624 -21625  184  21626 0
-21623  21624 -21625  184  21627 0
-21623  21624 -21625  184 -21628 0

c  -2-1 --> break 
c    ( b^{184, 1}_2 ∧  b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧ -p_184) -> break
c  in CNF:
c    -b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨  b^{184, 1}_0 ∨  p_184 ∨ break
c  in DIMACS:
-21623 -21624  21625  184 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 1}_2 ∧ -b^{184, 1}_1 ∧ -b^{184, 1}_0 ∧ true) 
c  in CNF:
c    -b^{184, 1}_2 ∨  b^{184, 1}_1 ∨  b^{184, 1}_0 ∨ false 
c  in DIMACS:
-21623  21624  21625  0

c  3 does not represent an automaton state.
c    -(-b^{184, 1}_2 ∧  b^{184, 1}_1 ∧  b^{184, 1}_0 ∧ true) 
c  in CNF:
c     b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ false 
c  in DIMACS:
 21623 -21624 -21625  0
c  -3 does not represent an automaton state.
c    -( b^{184, 1}_2 ∧  b^{184, 1}_1 ∧  b^{184, 1}_0 ∧ true) 
c  in CNF:
c    -b^{184, 1}_2 ∨ -b^{184, 1}_1 ∨ -b^{184, 1}_0 ∨ false 
c  in DIMACS:
-21623 -21624 -21625  0

c i = 2
c  -2+1 --> -1
c    ( b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧  p_368) -> ( b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0)
c  in CNF:
c    -b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨  b^{184, 3}_2
c    -b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_1
c    -b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨  b^{184, 3}_0
c  in DIMACS:
-21626 -21627  21628 -368  21629 0
-21626 -21627  21628 -368 -21630 0
-21626 -21627  21628 -368  21631 0

c  -1+1 --> 0
c    ( b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0 ∧  p_368) -> (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧ -b^{184, 3}_0)
c  in CNF:
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_2
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_1
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_0
c  in DIMACS:
-21626  21627 -21628 -368 -21629 0
-21626  21627 -21628 -368 -21630 0
-21626  21627 -21628 -368 -21631 0

c  0+1 --> 1
c    (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧  p_368) -> (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0)
c  in CNF:
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_2
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_1
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨  b^{184, 3}_0
c  in DIMACS:
 21626  21627  21628 -368 -21629 0
 21626  21627  21628 -368 -21630 0
 21626  21627  21628 -368  21631 0

c  1+1 --> 2
c    (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0 ∧  p_368) -> (-b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0)
c  in CNF:
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_2
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨  b^{184, 3}_1
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ -p_368 ∨ -b^{184, 3}_0
c  in DIMACS:
 21626  21627 -21628 -368 -21629 0
 21626  21627 -21628 -368  21630 0
 21626  21627 -21628 -368 -21631 0

c  2+1 --> break 
c    (-b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧  p_368) -> break
c  in CNF:
c     b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 21626 -21627  21628 -368 1162 0


c  2-1 --> 1
c    (-b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧ -p_368) -> (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0)
c  in CNF:
c     b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_2
c     b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_1
c     b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨  b^{184, 3}_0
c  in DIMACS:
 21626 -21627  21628  368 -21629 0
 21626 -21627  21628  368 -21630 0
 21626 -21627  21628  368  21631 0

c  1-1 --> 0
c    (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0 ∧ -p_368) -> (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧ -b^{184, 3}_0)
c  in CNF:
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_2
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_1
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_0
c  in DIMACS:
 21626  21627 -21628  368 -21629 0
 21626  21627 -21628  368 -21630 0
 21626  21627 -21628  368 -21631 0

c  0-1 --> -1
c    (-b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧ -p_368) -> ( b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0)
c  in CNF:
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨  b^{184, 3}_2
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_1
c     b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨  b^{184, 3}_0
c  in DIMACS:
 21626  21627  21628  368  21629 0
 21626  21627  21628  368 -21630 0
 21626  21627  21628  368  21631 0

c  -1-1 --> -2
c    ( b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧  b^{184, 2}_0 ∧ -p_368) -> ( b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0)
c  in CNF:
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨  b^{184, 3}_2
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨  b^{184, 3}_1
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨  p_368 ∨ -b^{184, 3}_0
c  in DIMACS:
-21626  21627 -21628  368  21629 0
-21626  21627 -21628  368  21630 0
-21626  21627 -21628  368 -21631 0

c  -2-1 --> break 
c    ( b^{184, 2}_2 ∧  b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨  b^{184, 2}_0 ∨  p_368 ∨ break
c  in DIMACS:
-21626 -21627  21628  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 2}_2 ∧ -b^{184, 2}_1 ∧ -b^{184, 2}_0 ∧ true) 
c  in CNF:
c    -b^{184, 2}_2 ∨  b^{184, 2}_1 ∨  b^{184, 2}_0 ∨ false 
c  in DIMACS:
-21626  21627  21628  0

c  3 does not represent an automaton state.
c    -(-b^{184, 2}_2 ∧  b^{184, 2}_1 ∧  b^{184, 2}_0 ∧ true) 
c  in CNF:
c     b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ false 
c  in DIMACS:
 21626 -21627 -21628  0
c  -3 does not represent an automaton state.
c    -( b^{184, 2}_2 ∧  b^{184, 2}_1 ∧  b^{184, 2}_0 ∧ true) 
c  in CNF:
c    -b^{184, 2}_2 ∨ -b^{184, 2}_1 ∨ -b^{184, 2}_0 ∨ false 
c  in DIMACS:
-21626 -21627 -21628  0

c i = 3
c  -2+1 --> -1
c    ( b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧  p_552) -> ( b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0)
c  in CNF:
c    -b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨  b^{184, 4}_2
c    -b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_1
c    -b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨  b^{184, 4}_0
c  in DIMACS:
-21629 -21630  21631 -552  21632 0
-21629 -21630  21631 -552 -21633 0
-21629 -21630  21631 -552  21634 0

c  -1+1 --> 0
c    ( b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0 ∧  p_552) -> (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧ -b^{184, 4}_0)
c  in CNF:
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_2
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_1
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_0
c  in DIMACS:
-21629  21630 -21631 -552 -21632 0
-21629  21630 -21631 -552 -21633 0
-21629  21630 -21631 -552 -21634 0

c  0+1 --> 1
c    (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧  p_552) -> (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0)
c  in CNF:
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_2
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_1
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨  b^{184, 4}_0
c  in DIMACS:
 21629  21630  21631 -552 -21632 0
 21629  21630  21631 -552 -21633 0
 21629  21630  21631 -552  21634 0

c  1+1 --> 2
c    (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0 ∧  p_552) -> (-b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0)
c  in CNF:
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_2
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨  b^{184, 4}_1
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ -p_552 ∨ -b^{184, 4}_0
c  in DIMACS:
 21629  21630 -21631 -552 -21632 0
 21629  21630 -21631 -552  21633 0
 21629  21630 -21631 -552 -21634 0

c  2+1 --> break 
c    (-b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧  p_552) -> break
c  in CNF:
c     b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 21629 -21630  21631 -552 1162 0


c  2-1 --> 1
c    (-b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧ -p_552) -> (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0)
c  in CNF:
c     b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_2
c     b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_1
c     b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨  b^{184, 4}_0
c  in DIMACS:
 21629 -21630  21631  552 -21632 0
 21629 -21630  21631  552 -21633 0
 21629 -21630  21631  552  21634 0

c  1-1 --> 0
c    (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0 ∧ -p_552) -> (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧ -b^{184, 4}_0)
c  in CNF:
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_2
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_1
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_0
c  in DIMACS:
 21629  21630 -21631  552 -21632 0
 21629  21630 -21631  552 -21633 0
 21629  21630 -21631  552 -21634 0

c  0-1 --> -1
c    (-b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧ -p_552) -> ( b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0)
c  in CNF:
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨  b^{184, 4}_2
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_1
c     b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨  b^{184, 4}_0
c  in DIMACS:
 21629  21630  21631  552  21632 0
 21629  21630  21631  552 -21633 0
 21629  21630  21631  552  21634 0

c  -1-1 --> -2
c    ( b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧  b^{184, 3}_0 ∧ -p_552) -> ( b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0)
c  in CNF:
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨  b^{184, 4}_2
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨  b^{184, 4}_1
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨  p_552 ∨ -b^{184, 4}_0
c  in DIMACS:
-21629  21630 -21631  552  21632 0
-21629  21630 -21631  552  21633 0
-21629  21630 -21631  552 -21634 0

c  -2-1 --> break 
c    ( b^{184, 3}_2 ∧  b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨  b^{184, 3}_0 ∨  p_552 ∨ break
c  in DIMACS:
-21629 -21630  21631  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 3}_2 ∧ -b^{184, 3}_1 ∧ -b^{184, 3}_0 ∧ true) 
c  in CNF:
c    -b^{184, 3}_2 ∨  b^{184, 3}_1 ∨  b^{184, 3}_0 ∨ false 
c  in DIMACS:
-21629  21630  21631  0

c  3 does not represent an automaton state.
c    -(-b^{184, 3}_2 ∧  b^{184, 3}_1 ∧  b^{184, 3}_0 ∧ true) 
c  in CNF:
c     b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ false 
c  in DIMACS:
 21629 -21630 -21631  0
c  -3 does not represent an automaton state.
c    -( b^{184, 3}_2 ∧  b^{184, 3}_1 ∧  b^{184, 3}_0 ∧ true) 
c  in CNF:
c    -b^{184, 3}_2 ∨ -b^{184, 3}_1 ∨ -b^{184, 3}_0 ∨ false 
c  in DIMACS:
-21629 -21630 -21631  0

c i = 4
c  -2+1 --> -1
c    ( b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧  p_736) -> ( b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0)
c  in CNF:
c    -b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨  b^{184, 5}_2
c    -b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_1
c    -b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨  b^{184, 5}_0
c  in DIMACS:
-21632 -21633  21634 -736  21635 0
-21632 -21633  21634 -736 -21636 0
-21632 -21633  21634 -736  21637 0

c  -1+1 --> 0
c    ( b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0 ∧  p_736) -> (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧ -b^{184, 5}_0)
c  in CNF:
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_2
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_1
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_0
c  in DIMACS:
-21632  21633 -21634 -736 -21635 0
-21632  21633 -21634 -736 -21636 0
-21632  21633 -21634 -736 -21637 0

c  0+1 --> 1
c    (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧  p_736) -> (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0)
c  in CNF:
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_2
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_1
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨  b^{184, 5}_0
c  in DIMACS:
 21632  21633  21634 -736 -21635 0
 21632  21633  21634 -736 -21636 0
 21632  21633  21634 -736  21637 0

c  1+1 --> 2
c    (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0 ∧  p_736) -> (-b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0)
c  in CNF:
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_2
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨  b^{184, 5}_1
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ -p_736 ∨ -b^{184, 5}_0
c  in DIMACS:
 21632  21633 -21634 -736 -21635 0
 21632  21633 -21634 -736  21636 0
 21632  21633 -21634 -736 -21637 0

c  2+1 --> break 
c    (-b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧  p_736) -> break
c  in CNF:
c     b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 21632 -21633  21634 -736 1162 0


c  2-1 --> 1
c    (-b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧ -p_736) -> (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0)
c  in CNF:
c     b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_2
c     b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_1
c     b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨  b^{184, 5}_0
c  in DIMACS:
 21632 -21633  21634  736 -21635 0
 21632 -21633  21634  736 -21636 0
 21632 -21633  21634  736  21637 0

c  1-1 --> 0
c    (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0 ∧ -p_736) -> (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧ -b^{184, 5}_0)
c  in CNF:
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_2
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_1
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_0
c  in DIMACS:
 21632  21633 -21634  736 -21635 0
 21632  21633 -21634  736 -21636 0
 21632  21633 -21634  736 -21637 0

c  0-1 --> -1
c    (-b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧ -p_736) -> ( b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0)
c  in CNF:
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨  b^{184, 5}_2
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_1
c     b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨  b^{184, 5}_0
c  in DIMACS:
 21632  21633  21634  736  21635 0
 21632  21633  21634  736 -21636 0
 21632  21633  21634  736  21637 0

c  -1-1 --> -2
c    ( b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧  b^{184, 4}_0 ∧ -p_736) -> ( b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0)
c  in CNF:
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨  b^{184, 5}_2
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨  b^{184, 5}_1
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨  p_736 ∨ -b^{184, 5}_0
c  in DIMACS:
-21632  21633 -21634  736  21635 0
-21632  21633 -21634  736  21636 0
-21632  21633 -21634  736 -21637 0

c  -2-1 --> break 
c    ( b^{184, 4}_2 ∧  b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨  b^{184, 4}_0 ∨  p_736 ∨ break
c  in DIMACS:
-21632 -21633  21634  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 4}_2 ∧ -b^{184, 4}_1 ∧ -b^{184, 4}_0 ∧ true) 
c  in CNF:
c    -b^{184, 4}_2 ∨  b^{184, 4}_1 ∨  b^{184, 4}_0 ∨ false 
c  in DIMACS:
-21632  21633  21634  0

c  3 does not represent an automaton state.
c    -(-b^{184, 4}_2 ∧  b^{184, 4}_1 ∧  b^{184, 4}_0 ∧ true) 
c  in CNF:
c     b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ false 
c  in DIMACS:
 21632 -21633 -21634  0
c  -3 does not represent an automaton state.
c    -( b^{184, 4}_2 ∧  b^{184, 4}_1 ∧  b^{184, 4}_0 ∧ true) 
c  in CNF:
c    -b^{184, 4}_2 ∨ -b^{184, 4}_1 ∨ -b^{184, 4}_0 ∨ false 
c  in DIMACS:
-21632 -21633 -21634  0

c i = 5
c  -2+1 --> -1
c    ( b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧  p_920) -> ( b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0)
c  in CNF:
c    -b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨  b^{184, 6}_2
c    -b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_1
c    -b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨  b^{184, 6}_0
c  in DIMACS:
-21635 -21636  21637 -920  21638 0
-21635 -21636  21637 -920 -21639 0
-21635 -21636  21637 -920  21640 0

c  -1+1 --> 0
c    ( b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0 ∧  p_920) -> (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧ -b^{184, 6}_0)
c  in CNF:
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_2
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_1
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_0
c  in DIMACS:
-21635  21636 -21637 -920 -21638 0
-21635  21636 -21637 -920 -21639 0
-21635  21636 -21637 -920 -21640 0

c  0+1 --> 1
c    (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧  p_920) -> (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0)
c  in CNF:
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_2
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_1
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨  b^{184, 6}_0
c  in DIMACS:
 21635  21636  21637 -920 -21638 0
 21635  21636  21637 -920 -21639 0
 21635  21636  21637 -920  21640 0

c  1+1 --> 2
c    (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0 ∧  p_920) -> (-b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0)
c  in CNF:
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_2
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨  b^{184, 6}_1
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ -p_920 ∨ -b^{184, 6}_0
c  in DIMACS:
 21635  21636 -21637 -920 -21638 0
 21635  21636 -21637 -920  21639 0
 21635  21636 -21637 -920 -21640 0

c  2+1 --> break 
c    (-b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧  p_920) -> break
c  in CNF:
c     b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 21635 -21636  21637 -920 1162 0


c  2-1 --> 1
c    (-b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧ -p_920) -> (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0)
c  in CNF:
c     b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_2
c     b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_1
c     b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨  b^{184, 6}_0
c  in DIMACS:
 21635 -21636  21637  920 -21638 0
 21635 -21636  21637  920 -21639 0
 21635 -21636  21637  920  21640 0

c  1-1 --> 0
c    (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0 ∧ -p_920) -> (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧ -b^{184, 6}_0)
c  in CNF:
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_2
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_1
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_0
c  in DIMACS:
 21635  21636 -21637  920 -21638 0
 21635  21636 -21637  920 -21639 0
 21635  21636 -21637  920 -21640 0

c  0-1 --> -1
c    (-b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧ -p_920) -> ( b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0)
c  in CNF:
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨  b^{184, 6}_2
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_1
c     b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨  b^{184, 6}_0
c  in DIMACS:
 21635  21636  21637  920  21638 0
 21635  21636  21637  920 -21639 0
 21635  21636  21637  920  21640 0

c  -1-1 --> -2
c    ( b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧  b^{184, 5}_0 ∧ -p_920) -> ( b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0)
c  in CNF:
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨  b^{184, 6}_2
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨  b^{184, 6}_1
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨  p_920 ∨ -b^{184, 6}_0
c  in DIMACS:
-21635  21636 -21637  920  21638 0
-21635  21636 -21637  920  21639 0
-21635  21636 -21637  920 -21640 0

c  -2-1 --> break 
c    ( b^{184, 5}_2 ∧  b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨  b^{184, 5}_0 ∨  p_920 ∨ break
c  in DIMACS:
-21635 -21636  21637  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 5}_2 ∧ -b^{184, 5}_1 ∧ -b^{184, 5}_0 ∧ true) 
c  in CNF:
c    -b^{184, 5}_2 ∨  b^{184, 5}_1 ∨  b^{184, 5}_0 ∨ false 
c  in DIMACS:
-21635  21636  21637  0

c  3 does not represent an automaton state.
c    -(-b^{184, 5}_2 ∧  b^{184, 5}_1 ∧  b^{184, 5}_0 ∧ true) 
c  in CNF:
c     b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ false 
c  in DIMACS:
 21635 -21636 -21637  0
c  -3 does not represent an automaton state.
c    -( b^{184, 5}_2 ∧  b^{184, 5}_1 ∧  b^{184, 5}_0 ∧ true) 
c  in CNF:
c    -b^{184, 5}_2 ∨ -b^{184, 5}_1 ∨ -b^{184, 5}_0 ∨ false 
c  in DIMACS:
-21635 -21636 -21637  0

c i = 6
c  -2+1 --> -1
c    ( b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧  p_1104) -> ( b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧  b^{184, 7}_0)
c  in CNF:
c    -b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨  b^{184, 7}_2
c    -b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_1
c    -b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨  b^{184, 7}_0
c  in DIMACS:
-21638 -21639  21640 -1104  21641 0
-21638 -21639  21640 -1104 -21642 0
-21638 -21639  21640 -1104  21643 0

c  -1+1 --> 0
c    ( b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0 ∧  p_1104) -> (-b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧ -b^{184, 7}_0)
c  in CNF:
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_2
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_1
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_0
c  in DIMACS:
-21638  21639 -21640 -1104 -21641 0
-21638  21639 -21640 -1104 -21642 0
-21638  21639 -21640 -1104 -21643 0

c  0+1 --> 1
c    (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧  p_1104) -> (-b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧  b^{184, 7}_0)
c  in CNF:
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_2
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_1
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨  b^{184, 7}_0
c  in DIMACS:
 21638  21639  21640 -1104 -21641 0
 21638  21639  21640 -1104 -21642 0
 21638  21639  21640 -1104  21643 0

c  1+1 --> 2
c    (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0 ∧  p_1104) -> (-b^{184, 7}_2 ∧  b^{184, 7}_1 ∧ -b^{184, 7}_0)
c  in CNF:
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_2
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨  b^{184, 7}_1
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ -p_1104 ∨ -b^{184, 7}_0
c  in DIMACS:
 21638  21639 -21640 -1104 -21641 0
 21638  21639 -21640 -1104  21642 0
 21638  21639 -21640 -1104 -21643 0

c  2+1 --> break 
c    (-b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 21638 -21639  21640 -1104 1162 0


c  2-1 --> 1
c    (-b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧ -p_1104) -> (-b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧  b^{184, 7}_0)
c  in CNF:
c     b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_2
c     b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_1
c     b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨  b^{184, 7}_0
c  in DIMACS:
 21638 -21639  21640  1104 -21641 0
 21638 -21639  21640  1104 -21642 0
 21638 -21639  21640  1104  21643 0

c  1-1 --> 0
c    (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0 ∧ -p_1104) -> (-b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧ -b^{184, 7}_0)
c  in CNF:
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_2
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_1
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_0
c  in DIMACS:
 21638  21639 -21640  1104 -21641 0
 21638  21639 -21640  1104 -21642 0
 21638  21639 -21640  1104 -21643 0

c  0-1 --> -1
c    (-b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧ -p_1104) -> ( b^{184, 7}_2 ∧ -b^{184, 7}_1 ∧  b^{184, 7}_0)
c  in CNF:
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨  b^{184, 7}_2
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_1
c     b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨  b^{184, 7}_0
c  in DIMACS:
 21638  21639  21640  1104  21641 0
 21638  21639  21640  1104 -21642 0
 21638  21639  21640  1104  21643 0

c  -1-1 --> -2
c    ( b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧  b^{184, 6}_0 ∧ -p_1104) -> ( b^{184, 7}_2 ∧  b^{184, 7}_1 ∧ -b^{184, 7}_0)
c  in CNF:
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨  b^{184, 7}_2
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨  b^{184, 7}_1
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨  p_1104 ∨ -b^{184, 7}_0
c  in DIMACS:
-21638  21639 -21640  1104  21641 0
-21638  21639 -21640  1104  21642 0
-21638  21639 -21640  1104 -21643 0

c  -2-1 --> break 
c    ( b^{184, 6}_2 ∧  b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨  b^{184, 6}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-21638 -21639  21640  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{184, 6}_2 ∧ -b^{184, 6}_1 ∧ -b^{184, 6}_0 ∧ true) 
c  in CNF:
c    -b^{184, 6}_2 ∨  b^{184, 6}_1 ∨  b^{184, 6}_0 ∨ false 
c  in DIMACS:
-21638  21639  21640  0

c  3 does not represent an automaton state.
c    -(-b^{184, 6}_2 ∧  b^{184, 6}_1 ∧  b^{184, 6}_0 ∧ true) 
c  in CNF:
c     b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ false 
c  in DIMACS:
 21638 -21639 -21640  0
c  -3 does not represent an automaton state.
c    -( b^{184, 6}_2 ∧  b^{184, 6}_1 ∧  b^{184, 6}_0 ∧ true) 
c  in CNF:
c    -b^{184, 6}_2 ∨ -b^{184, 6}_1 ∨ -b^{184, 6}_0 ∨ false 
c  in DIMACS:
-21638 -21639 -21640  0

c INIT for k = 185
c    -b^{185, 1}_2
c    -b^{185, 1}_1
c    -b^{185, 1}_0
c  in DIMACS:
-21644 0
-21645 0
-21646 0

c Transitions for k = 185
c i = 1
c  -2+1 --> -1
c    ( b^{185, 1}_2 ∧  b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧  p_185) -> ( b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0)
c  in CNF:
c    -b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨  b^{185, 2}_2
c    -b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_1
c    -b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨  b^{185, 2}_0
c  in DIMACS:
-21644 -21645  21646 -185  21647 0
-21644 -21645  21646 -185 -21648 0
-21644 -21645  21646 -185  21649 0

c  -1+1 --> 0
c    ( b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧  b^{185, 1}_0 ∧  p_185) -> (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧ -b^{185, 2}_0)
c  in CNF:
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_2
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_1
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_0
c  in DIMACS:
-21644  21645 -21646 -185 -21647 0
-21644  21645 -21646 -185 -21648 0
-21644  21645 -21646 -185 -21649 0

c  0+1 --> 1
c    (-b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧  p_185) -> (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0)
c  in CNF:
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_2
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_1
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨  b^{185, 2}_0
c  in DIMACS:
 21644  21645  21646 -185 -21647 0
 21644  21645  21646 -185 -21648 0
 21644  21645  21646 -185  21649 0

c  1+1 --> 2
c    (-b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧  b^{185, 1}_0 ∧  p_185) -> (-b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0)
c  in CNF:
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_2
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨  b^{185, 2}_1
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ -p_185 ∨ -b^{185, 2}_0
c  in DIMACS:
 21644  21645 -21646 -185 -21647 0
 21644  21645 -21646 -185  21648 0
 21644  21645 -21646 -185 -21649 0

c  2+1 --> break 
c    (-b^{185, 1}_2 ∧  b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧  p_185) -> break
c  in CNF:
c     b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ -p_185 ∨ break
c  in DIMACS:
 21644 -21645  21646 -185 1162 0


c  2-1 --> 1
c    (-b^{185, 1}_2 ∧  b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧ -p_185) -> (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0)
c  in CNF:
c     b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_2
c     b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_1
c     b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨  b^{185, 2}_0
c  in DIMACS:
 21644 -21645  21646  185 -21647 0
 21644 -21645  21646  185 -21648 0
 21644 -21645  21646  185  21649 0

c  1-1 --> 0
c    (-b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧  b^{185, 1}_0 ∧ -p_185) -> (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧ -b^{185, 2}_0)
c  in CNF:
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_2
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_1
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_0
c  in DIMACS:
 21644  21645 -21646  185 -21647 0
 21644  21645 -21646  185 -21648 0
 21644  21645 -21646  185 -21649 0

c  0-1 --> -1
c    (-b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧ -p_185) -> ( b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0)
c  in CNF:
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨  b^{185, 2}_2
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_1
c     b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨  b^{185, 2}_0
c  in DIMACS:
 21644  21645  21646  185  21647 0
 21644  21645  21646  185 -21648 0
 21644  21645  21646  185  21649 0

c  -1-1 --> -2
c    ( b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧  b^{185, 1}_0 ∧ -p_185) -> ( b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0)
c  in CNF:
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨  b^{185, 2}_2
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨  b^{185, 2}_1
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨  p_185 ∨ -b^{185, 2}_0
c  in DIMACS:
-21644  21645 -21646  185  21647 0
-21644  21645 -21646  185  21648 0
-21644  21645 -21646  185 -21649 0

c  -2-1 --> break 
c    ( b^{185, 1}_2 ∧  b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧ -p_185) -> break
c  in CNF:
c    -b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨  b^{185, 1}_0 ∨  p_185 ∨ break
c  in DIMACS:
-21644 -21645  21646  185 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 1}_2 ∧ -b^{185, 1}_1 ∧ -b^{185, 1}_0 ∧ true) 
c  in CNF:
c    -b^{185, 1}_2 ∨  b^{185, 1}_1 ∨  b^{185, 1}_0 ∨ false 
c  in DIMACS:
-21644  21645  21646  0

c  3 does not represent an automaton state.
c    -(-b^{185, 1}_2 ∧  b^{185, 1}_1 ∧  b^{185, 1}_0 ∧ true) 
c  in CNF:
c     b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ false 
c  in DIMACS:
 21644 -21645 -21646  0
c  -3 does not represent an automaton state.
c    -( b^{185, 1}_2 ∧  b^{185, 1}_1 ∧  b^{185, 1}_0 ∧ true) 
c  in CNF:
c    -b^{185, 1}_2 ∨ -b^{185, 1}_1 ∨ -b^{185, 1}_0 ∨ false 
c  in DIMACS:
-21644 -21645 -21646  0

c i = 2
c  -2+1 --> -1
c    ( b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧  p_370) -> ( b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0)
c  in CNF:
c    -b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨  b^{185, 3}_2
c    -b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_1
c    -b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨  b^{185, 3}_0
c  in DIMACS:
-21647 -21648  21649 -370  21650 0
-21647 -21648  21649 -370 -21651 0
-21647 -21648  21649 -370  21652 0

c  -1+1 --> 0
c    ( b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0 ∧  p_370) -> (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧ -b^{185, 3}_0)
c  in CNF:
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_2
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_1
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_0
c  in DIMACS:
-21647  21648 -21649 -370 -21650 0
-21647  21648 -21649 -370 -21651 0
-21647  21648 -21649 -370 -21652 0

c  0+1 --> 1
c    (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧  p_370) -> (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0)
c  in CNF:
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_2
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_1
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨  b^{185, 3}_0
c  in DIMACS:
 21647  21648  21649 -370 -21650 0
 21647  21648  21649 -370 -21651 0
 21647  21648  21649 -370  21652 0

c  1+1 --> 2
c    (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0 ∧  p_370) -> (-b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0)
c  in CNF:
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_2
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨  b^{185, 3}_1
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ -p_370 ∨ -b^{185, 3}_0
c  in DIMACS:
 21647  21648 -21649 -370 -21650 0
 21647  21648 -21649 -370  21651 0
 21647  21648 -21649 -370 -21652 0

c  2+1 --> break 
c    (-b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧  p_370) -> break
c  in CNF:
c     b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 21647 -21648  21649 -370 1162 0


c  2-1 --> 1
c    (-b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧ -p_370) -> (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0)
c  in CNF:
c     b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_2
c     b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_1
c     b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨  b^{185, 3}_0
c  in DIMACS:
 21647 -21648  21649  370 -21650 0
 21647 -21648  21649  370 -21651 0
 21647 -21648  21649  370  21652 0

c  1-1 --> 0
c    (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0 ∧ -p_370) -> (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧ -b^{185, 3}_0)
c  in CNF:
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_2
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_1
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_0
c  in DIMACS:
 21647  21648 -21649  370 -21650 0
 21647  21648 -21649  370 -21651 0
 21647  21648 -21649  370 -21652 0

c  0-1 --> -1
c    (-b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧ -p_370) -> ( b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0)
c  in CNF:
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨  b^{185, 3}_2
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_1
c     b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨  b^{185, 3}_0
c  in DIMACS:
 21647  21648  21649  370  21650 0
 21647  21648  21649  370 -21651 0
 21647  21648  21649  370  21652 0

c  -1-1 --> -2
c    ( b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧  b^{185, 2}_0 ∧ -p_370) -> ( b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0)
c  in CNF:
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨  b^{185, 3}_2
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨  b^{185, 3}_1
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨  p_370 ∨ -b^{185, 3}_0
c  in DIMACS:
-21647  21648 -21649  370  21650 0
-21647  21648 -21649  370  21651 0
-21647  21648 -21649  370 -21652 0

c  -2-1 --> break 
c    ( b^{185, 2}_2 ∧  b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨  b^{185, 2}_0 ∨  p_370 ∨ break
c  in DIMACS:
-21647 -21648  21649  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 2}_2 ∧ -b^{185, 2}_1 ∧ -b^{185, 2}_0 ∧ true) 
c  in CNF:
c    -b^{185, 2}_2 ∨  b^{185, 2}_1 ∨  b^{185, 2}_0 ∨ false 
c  in DIMACS:
-21647  21648  21649  0

c  3 does not represent an automaton state.
c    -(-b^{185, 2}_2 ∧  b^{185, 2}_1 ∧  b^{185, 2}_0 ∧ true) 
c  in CNF:
c     b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ false 
c  in DIMACS:
 21647 -21648 -21649  0
c  -3 does not represent an automaton state.
c    -( b^{185, 2}_2 ∧  b^{185, 2}_1 ∧  b^{185, 2}_0 ∧ true) 
c  in CNF:
c    -b^{185, 2}_2 ∨ -b^{185, 2}_1 ∨ -b^{185, 2}_0 ∨ false 
c  in DIMACS:
-21647 -21648 -21649  0

c i = 3
c  -2+1 --> -1
c    ( b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧  p_555) -> ( b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0)
c  in CNF:
c    -b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨  b^{185, 4}_2
c    -b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_1
c    -b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨  b^{185, 4}_0
c  in DIMACS:
-21650 -21651  21652 -555  21653 0
-21650 -21651  21652 -555 -21654 0
-21650 -21651  21652 -555  21655 0

c  -1+1 --> 0
c    ( b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0 ∧  p_555) -> (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧ -b^{185, 4}_0)
c  in CNF:
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_2
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_1
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_0
c  in DIMACS:
-21650  21651 -21652 -555 -21653 0
-21650  21651 -21652 -555 -21654 0
-21650  21651 -21652 -555 -21655 0

c  0+1 --> 1
c    (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧  p_555) -> (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0)
c  in CNF:
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_2
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_1
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨  b^{185, 4}_0
c  in DIMACS:
 21650  21651  21652 -555 -21653 0
 21650  21651  21652 -555 -21654 0
 21650  21651  21652 -555  21655 0

c  1+1 --> 2
c    (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0 ∧  p_555) -> (-b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0)
c  in CNF:
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_2
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨  b^{185, 4}_1
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ -p_555 ∨ -b^{185, 4}_0
c  in DIMACS:
 21650  21651 -21652 -555 -21653 0
 21650  21651 -21652 -555  21654 0
 21650  21651 -21652 -555 -21655 0

c  2+1 --> break 
c    (-b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧  p_555) -> break
c  in CNF:
c     b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ -p_555 ∨ break
c  in DIMACS:
 21650 -21651  21652 -555 1162 0


c  2-1 --> 1
c    (-b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧ -p_555) -> (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0)
c  in CNF:
c     b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_2
c     b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_1
c     b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨  b^{185, 4}_0
c  in DIMACS:
 21650 -21651  21652  555 -21653 0
 21650 -21651  21652  555 -21654 0
 21650 -21651  21652  555  21655 0

c  1-1 --> 0
c    (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0 ∧ -p_555) -> (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧ -b^{185, 4}_0)
c  in CNF:
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_2
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_1
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_0
c  in DIMACS:
 21650  21651 -21652  555 -21653 0
 21650  21651 -21652  555 -21654 0
 21650  21651 -21652  555 -21655 0

c  0-1 --> -1
c    (-b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧ -p_555) -> ( b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0)
c  in CNF:
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨  b^{185, 4}_2
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_1
c     b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨  b^{185, 4}_0
c  in DIMACS:
 21650  21651  21652  555  21653 0
 21650  21651  21652  555 -21654 0
 21650  21651  21652  555  21655 0

c  -1-1 --> -2
c    ( b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧  b^{185, 3}_0 ∧ -p_555) -> ( b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0)
c  in CNF:
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨  b^{185, 4}_2
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨  b^{185, 4}_1
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨  p_555 ∨ -b^{185, 4}_0
c  in DIMACS:
-21650  21651 -21652  555  21653 0
-21650  21651 -21652  555  21654 0
-21650  21651 -21652  555 -21655 0

c  -2-1 --> break 
c    ( b^{185, 3}_2 ∧  b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧ -p_555) -> break
c  in CNF:
c    -b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨  b^{185, 3}_0 ∨  p_555 ∨ break
c  in DIMACS:
-21650 -21651  21652  555 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 3}_2 ∧ -b^{185, 3}_1 ∧ -b^{185, 3}_0 ∧ true) 
c  in CNF:
c    -b^{185, 3}_2 ∨  b^{185, 3}_1 ∨  b^{185, 3}_0 ∨ false 
c  in DIMACS:
-21650  21651  21652  0

c  3 does not represent an automaton state.
c    -(-b^{185, 3}_2 ∧  b^{185, 3}_1 ∧  b^{185, 3}_0 ∧ true) 
c  in CNF:
c     b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ false 
c  in DIMACS:
 21650 -21651 -21652  0
c  -3 does not represent an automaton state.
c    -( b^{185, 3}_2 ∧  b^{185, 3}_1 ∧  b^{185, 3}_0 ∧ true) 
c  in CNF:
c    -b^{185, 3}_2 ∨ -b^{185, 3}_1 ∨ -b^{185, 3}_0 ∨ false 
c  in DIMACS:
-21650 -21651 -21652  0

c i = 4
c  -2+1 --> -1
c    ( b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧  p_740) -> ( b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0)
c  in CNF:
c    -b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨  b^{185, 5}_2
c    -b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_1
c    -b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨  b^{185, 5}_0
c  in DIMACS:
-21653 -21654  21655 -740  21656 0
-21653 -21654  21655 -740 -21657 0
-21653 -21654  21655 -740  21658 0

c  -1+1 --> 0
c    ( b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0 ∧  p_740) -> (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧ -b^{185, 5}_0)
c  in CNF:
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_2
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_1
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_0
c  in DIMACS:
-21653  21654 -21655 -740 -21656 0
-21653  21654 -21655 -740 -21657 0
-21653  21654 -21655 -740 -21658 0

c  0+1 --> 1
c    (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧  p_740) -> (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0)
c  in CNF:
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_2
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_1
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨  b^{185, 5}_0
c  in DIMACS:
 21653  21654  21655 -740 -21656 0
 21653  21654  21655 -740 -21657 0
 21653  21654  21655 -740  21658 0

c  1+1 --> 2
c    (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0 ∧  p_740) -> (-b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0)
c  in CNF:
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_2
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨  b^{185, 5}_1
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ -p_740 ∨ -b^{185, 5}_0
c  in DIMACS:
 21653  21654 -21655 -740 -21656 0
 21653  21654 -21655 -740  21657 0
 21653  21654 -21655 -740 -21658 0

c  2+1 --> break 
c    (-b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧  p_740) -> break
c  in CNF:
c     b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 21653 -21654  21655 -740 1162 0


c  2-1 --> 1
c    (-b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧ -p_740) -> (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0)
c  in CNF:
c     b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_2
c     b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_1
c     b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨  b^{185, 5}_0
c  in DIMACS:
 21653 -21654  21655  740 -21656 0
 21653 -21654  21655  740 -21657 0
 21653 -21654  21655  740  21658 0

c  1-1 --> 0
c    (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0 ∧ -p_740) -> (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧ -b^{185, 5}_0)
c  in CNF:
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_2
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_1
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_0
c  in DIMACS:
 21653  21654 -21655  740 -21656 0
 21653  21654 -21655  740 -21657 0
 21653  21654 -21655  740 -21658 0

c  0-1 --> -1
c    (-b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧ -p_740) -> ( b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0)
c  in CNF:
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨  b^{185, 5}_2
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_1
c     b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨  b^{185, 5}_0
c  in DIMACS:
 21653  21654  21655  740  21656 0
 21653  21654  21655  740 -21657 0
 21653  21654  21655  740  21658 0

c  -1-1 --> -2
c    ( b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧  b^{185, 4}_0 ∧ -p_740) -> ( b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0)
c  in CNF:
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨  b^{185, 5}_2
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨  b^{185, 5}_1
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨  p_740 ∨ -b^{185, 5}_0
c  in DIMACS:
-21653  21654 -21655  740  21656 0
-21653  21654 -21655  740  21657 0
-21653  21654 -21655  740 -21658 0

c  -2-1 --> break 
c    ( b^{185, 4}_2 ∧  b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨  b^{185, 4}_0 ∨  p_740 ∨ break
c  in DIMACS:
-21653 -21654  21655  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 4}_2 ∧ -b^{185, 4}_1 ∧ -b^{185, 4}_0 ∧ true) 
c  in CNF:
c    -b^{185, 4}_2 ∨  b^{185, 4}_1 ∨  b^{185, 4}_0 ∨ false 
c  in DIMACS:
-21653  21654  21655  0

c  3 does not represent an automaton state.
c    -(-b^{185, 4}_2 ∧  b^{185, 4}_1 ∧  b^{185, 4}_0 ∧ true) 
c  in CNF:
c     b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ false 
c  in DIMACS:
 21653 -21654 -21655  0
c  -3 does not represent an automaton state.
c    -( b^{185, 4}_2 ∧  b^{185, 4}_1 ∧  b^{185, 4}_0 ∧ true) 
c  in CNF:
c    -b^{185, 4}_2 ∨ -b^{185, 4}_1 ∨ -b^{185, 4}_0 ∨ false 
c  in DIMACS:
-21653 -21654 -21655  0

c i = 5
c  -2+1 --> -1
c    ( b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧  p_925) -> ( b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0)
c  in CNF:
c    -b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨  b^{185, 6}_2
c    -b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_1
c    -b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨  b^{185, 6}_0
c  in DIMACS:
-21656 -21657  21658 -925  21659 0
-21656 -21657  21658 -925 -21660 0
-21656 -21657  21658 -925  21661 0

c  -1+1 --> 0
c    ( b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0 ∧  p_925) -> (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧ -b^{185, 6}_0)
c  in CNF:
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_2
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_1
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_0
c  in DIMACS:
-21656  21657 -21658 -925 -21659 0
-21656  21657 -21658 -925 -21660 0
-21656  21657 -21658 -925 -21661 0

c  0+1 --> 1
c    (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧  p_925) -> (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0)
c  in CNF:
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_2
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_1
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨  b^{185, 6}_0
c  in DIMACS:
 21656  21657  21658 -925 -21659 0
 21656  21657  21658 -925 -21660 0
 21656  21657  21658 -925  21661 0

c  1+1 --> 2
c    (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0 ∧  p_925) -> (-b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0)
c  in CNF:
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_2
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨  b^{185, 6}_1
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ -p_925 ∨ -b^{185, 6}_0
c  in DIMACS:
 21656  21657 -21658 -925 -21659 0
 21656  21657 -21658 -925  21660 0
 21656  21657 -21658 -925 -21661 0

c  2+1 --> break 
c    (-b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧  p_925) -> break
c  in CNF:
c     b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ -p_925 ∨ break
c  in DIMACS:
 21656 -21657  21658 -925 1162 0


c  2-1 --> 1
c    (-b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧ -p_925) -> (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0)
c  in CNF:
c     b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_2
c     b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_1
c     b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨  b^{185, 6}_0
c  in DIMACS:
 21656 -21657  21658  925 -21659 0
 21656 -21657  21658  925 -21660 0
 21656 -21657  21658  925  21661 0

c  1-1 --> 0
c    (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0 ∧ -p_925) -> (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧ -b^{185, 6}_0)
c  in CNF:
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_2
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_1
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_0
c  in DIMACS:
 21656  21657 -21658  925 -21659 0
 21656  21657 -21658  925 -21660 0
 21656  21657 -21658  925 -21661 0

c  0-1 --> -1
c    (-b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧ -p_925) -> ( b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0)
c  in CNF:
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨  b^{185, 6}_2
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_1
c     b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨  b^{185, 6}_0
c  in DIMACS:
 21656  21657  21658  925  21659 0
 21656  21657  21658  925 -21660 0
 21656  21657  21658  925  21661 0

c  -1-1 --> -2
c    ( b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧  b^{185, 5}_0 ∧ -p_925) -> ( b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0)
c  in CNF:
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨  b^{185, 6}_2
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨  b^{185, 6}_1
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨  p_925 ∨ -b^{185, 6}_0
c  in DIMACS:
-21656  21657 -21658  925  21659 0
-21656  21657 -21658  925  21660 0
-21656  21657 -21658  925 -21661 0

c  -2-1 --> break 
c    ( b^{185, 5}_2 ∧  b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧ -p_925) -> break
c  in CNF:
c    -b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨  b^{185, 5}_0 ∨  p_925 ∨ break
c  in DIMACS:
-21656 -21657  21658  925 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 5}_2 ∧ -b^{185, 5}_1 ∧ -b^{185, 5}_0 ∧ true) 
c  in CNF:
c    -b^{185, 5}_2 ∨  b^{185, 5}_1 ∨  b^{185, 5}_0 ∨ false 
c  in DIMACS:
-21656  21657  21658  0

c  3 does not represent an automaton state.
c    -(-b^{185, 5}_2 ∧  b^{185, 5}_1 ∧  b^{185, 5}_0 ∧ true) 
c  in CNF:
c     b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ false 
c  in DIMACS:
 21656 -21657 -21658  0
c  -3 does not represent an automaton state.
c    -( b^{185, 5}_2 ∧  b^{185, 5}_1 ∧  b^{185, 5}_0 ∧ true) 
c  in CNF:
c    -b^{185, 5}_2 ∨ -b^{185, 5}_1 ∨ -b^{185, 5}_0 ∨ false 
c  in DIMACS:
-21656 -21657 -21658  0

c i = 6
c  -2+1 --> -1
c    ( b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧  p_1110) -> ( b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧  b^{185, 7}_0)
c  in CNF:
c    -b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨  b^{185, 7}_2
c    -b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_1
c    -b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨  b^{185, 7}_0
c  in DIMACS:
-21659 -21660  21661 -1110  21662 0
-21659 -21660  21661 -1110 -21663 0
-21659 -21660  21661 -1110  21664 0

c  -1+1 --> 0
c    ( b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0 ∧  p_1110) -> (-b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧ -b^{185, 7}_0)
c  in CNF:
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_2
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_1
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_0
c  in DIMACS:
-21659  21660 -21661 -1110 -21662 0
-21659  21660 -21661 -1110 -21663 0
-21659  21660 -21661 -1110 -21664 0

c  0+1 --> 1
c    (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧  p_1110) -> (-b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧  b^{185, 7}_0)
c  in CNF:
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_2
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_1
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨  b^{185, 7}_0
c  in DIMACS:
 21659  21660  21661 -1110 -21662 0
 21659  21660  21661 -1110 -21663 0
 21659  21660  21661 -1110  21664 0

c  1+1 --> 2
c    (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0 ∧  p_1110) -> (-b^{185, 7}_2 ∧  b^{185, 7}_1 ∧ -b^{185, 7}_0)
c  in CNF:
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_2
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨  b^{185, 7}_1
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ -p_1110 ∨ -b^{185, 7}_0
c  in DIMACS:
 21659  21660 -21661 -1110 -21662 0
 21659  21660 -21661 -1110  21663 0
 21659  21660 -21661 -1110 -21664 0

c  2+1 --> break 
c    (-b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 21659 -21660  21661 -1110 1162 0


c  2-1 --> 1
c    (-b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧ -p_1110) -> (-b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧  b^{185, 7}_0)
c  in CNF:
c     b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_2
c     b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_1
c     b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨  b^{185, 7}_0
c  in DIMACS:
 21659 -21660  21661  1110 -21662 0
 21659 -21660  21661  1110 -21663 0
 21659 -21660  21661  1110  21664 0

c  1-1 --> 0
c    (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0 ∧ -p_1110) -> (-b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧ -b^{185, 7}_0)
c  in CNF:
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_2
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_1
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_0
c  in DIMACS:
 21659  21660 -21661  1110 -21662 0
 21659  21660 -21661  1110 -21663 0
 21659  21660 -21661  1110 -21664 0

c  0-1 --> -1
c    (-b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧ -p_1110) -> ( b^{185, 7}_2 ∧ -b^{185, 7}_1 ∧  b^{185, 7}_0)
c  in CNF:
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨  b^{185, 7}_2
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_1
c     b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨  b^{185, 7}_0
c  in DIMACS:
 21659  21660  21661  1110  21662 0
 21659  21660  21661  1110 -21663 0
 21659  21660  21661  1110  21664 0

c  -1-1 --> -2
c    ( b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧  b^{185, 6}_0 ∧ -p_1110) -> ( b^{185, 7}_2 ∧  b^{185, 7}_1 ∧ -b^{185, 7}_0)
c  in CNF:
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨  b^{185, 7}_2
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨  b^{185, 7}_1
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨  p_1110 ∨ -b^{185, 7}_0
c  in DIMACS:
-21659  21660 -21661  1110  21662 0
-21659  21660 -21661  1110  21663 0
-21659  21660 -21661  1110 -21664 0

c  -2-1 --> break 
c    ( b^{185, 6}_2 ∧  b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨  b^{185, 6}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-21659 -21660  21661  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{185, 6}_2 ∧ -b^{185, 6}_1 ∧ -b^{185, 6}_0 ∧ true) 
c  in CNF:
c    -b^{185, 6}_2 ∨  b^{185, 6}_1 ∨  b^{185, 6}_0 ∨ false 
c  in DIMACS:
-21659  21660  21661  0

c  3 does not represent an automaton state.
c    -(-b^{185, 6}_2 ∧  b^{185, 6}_1 ∧  b^{185, 6}_0 ∧ true) 
c  in CNF:
c     b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ false 
c  in DIMACS:
 21659 -21660 -21661  0
c  -3 does not represent an automaton state.
c    -( b^{185, 6}_2 ∧  b^{185, 6}_1 ∧  b^{185, 6}_0 ∧ true) 
c  in CNF:
c    -b^{185, 6}_2 ∨ -b^{185, 6}_1 ∨ -b^{185, 6}_0 ∨ false 
c  in DIMACS:
-21659 -21660 -21661  0

c INIT for k = 186
c    -b^{186, 1}_2
c    -b^{186, 1}_1
c    -b^{186, 1}_0
c  in DIMACS:
-21665 0
-21666 0
-21667 0

c Transitions for k = 186
c i = 1
c  -2+1 --> -1
c    ( b^{186, 1}_2 ∧  b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧  p_186) -> ( b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0)
c  in CNF:
c    -b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨  b^{186, 2}_2
c    -b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_1
c    -b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨  b^{186, 2}_0
c  in DIMACS:
-21665 -21666  21667 -186  21668 0
-21665 -21666  21667 -186 -21669 0
-21665 -21666  21667 -186  21670 0

c  -1+1 --> 0
c    ( b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧  b^{186, 1}_0 ∧  p_186) -> (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧ -b^{186, 2}_0)
c  in CNF:
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_2
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_1
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_0
c  in DIMACS:
-21665  21666 -21667 -186 -21668 0
-21665  21666 -21667 -186 -21669 0
-21665  21666 -21667 -186 -21670 0

c  0+1 --> 1
c    (-b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧  p_186) -> (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0)
c  in CNF:
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_2
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_1
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨  b^{186, 2}_0
c  in DIMACS:
 21665  21666  21667 -186 -21668 0
 21665  21666  21667 -186 -21669 0
 21665  21666  21667 -186  21670 0

c  1+1 --> 2
c    (-b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧  b^{186, 1}_0 ∧  p_186) -> (-b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0)
c  in CNF:
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_2
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨  b^{186, 2}_1
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ -p_186 ∨ -b^{186, 2}_0
c  in DIMACS:
 21665  21666 -21667 -186 -21668 0
 21665  21666 -21667 -186  21669 0
 21665  21666 -21667 -186 -21670 0

c  2+1 --> break 
c    (-b^{186, 1}_2 ∧  b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧  p_186) -> break
c  in CNF:
c     b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ -p_186 ∨ break
c  in DIMACS:
 21665 -21666  21667 -186 1162 0


c  2-1 --> 1
c    (-b^{186, 1}_2 ∧  b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧ -p_186) -> (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0)
c  in CNF:
c     b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_2
c     b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_1
c     b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨  b^{186, 2}_0
c  in DIMACS:
 21665 -21666  21667  186 -21668 0
 21665 -21666  21667  186 -21669 0
 21665 -21666  21667  186  21670 0

c  1-1 --> 0
c    (-b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧  b^{186, 1}_0 ∧ -p_186) -> (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧ -b^{186, 2}_0)
c  in CNF:
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_2
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_1
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_0
c  in DIMACS:
 21665  21666 -21667  186 -21668 0
 21665  21666 -21667  186 -21669 0
 21665  21666 -21667  186 -21670 0

c  0-1 --> -1
c    (-b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧ -p_186) -> ( b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0)
c  in CNF:
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨  b^{186, 2}_2
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_1
c     b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨  b^{186, 2}_0
c  in DIMACS:
 21665  21666  21667  186  21668 0
 21665  21666  21667  186 -21669 0
 21665  21666  21667  186  21670 0

c  -1-1 --> -2
c    ( b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧  b^{186, 1}_0 ∧ -p_186) -> ( b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0)
c  in CNF:
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨  b^{186, 2}_2
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨  b^{186, 2}_1
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨  p_186 ∨ -b^{186, 2}_0
c  in DIMACS:
-21665  21666 -21667  186  21668 0
-21665  21666 -21667  186  21669 0
-21665  21666 -21667  186 -21670 0

c  -2-1 --> break 
c    ( b^{186, 1}_2 ∧  b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧ -p_186) -> break
c  in CNF:
c    -b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨  b^{186, 1}_0 ∨  p_186 ∨ break
c  in DIMACS:
-21665 -21666  21667  186 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 1}_2 ∧ -b^{186, 1}_1 ∧ -b^{186, 1}_0 ∧ true) 
c  in CNF:
c    -b^{186, 1}_2 ∨  b^{186, 1}_1 ∨  b^{186, 1}_0 ∨ false 
c  in DIMACS:
-21665  21666  21667  0

c  3 does not represent an automaton state.
c    -(-b^{186, 1}_2 ∧  b^{186, 1}_1 ∧  b^{186, 1}_0 ∧ true) 
c  in CNF:
c     b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ false 
c  in DIMACS:
 21665 -21666 -21667  0
c  -3 does not represent an automaton state.
c    -( b^{186, 1}_2 ∧  b^{186, 1}_1 ∧  b^{186, 1}_0 ∧ true) 
c  in CNF:
c    -b^{186, 1}_2 ∨ -b^{186, 1}_1 ∨ -b^{186, 1}_0 ∨ false 
c  in DIMACS:
-21665 -21666 -21667  0

c i = 2
c  -2+1 --> -1
c    ( b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧  p_372) -> ( b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0)
c  in CNF:
c    -b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨  b^{186, 3}_2
c    -b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_1
c    -b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨  b^{186, 3}_0
c  in DIMACS:
-21668 -21669  21670 -372  21671 0
-21668 -21669  21670 -372 -21672 0
-21668 -21669  21670 -372  21673 0

c  -1+1 --> 0
c    ( b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0 ∧  p_372) -> (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧ -b^{186, 3}_0)
c  in CNF:
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_2
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_1
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_0
c  in DIMACS:
-21668  21669 -21670 -372 -21671 0
-21668  21669 -21670 -372 -21672 0
-21668  21669 -21670 -372 -21673 0

c  0+1 --> 1
c    (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧  p_372) -> (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0)
c  in CNF:
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_2
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_1
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨  b^{186, 3}_0
c  in DIMACS:
 21668  21669  21670 -372 -21671 0
 21668  21669  21670 -372 -21672 0
 21668  21669  21670 -372  21673 0

c  1+1 --> 2
c    (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0 ∧  p_372) -> (-b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0)
c  in CNF:
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_2
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨  b^{186, 3}_1
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ -p_372 ∨ -b^{186, 3}_0
c  in DIMACS:
 21668  21669 -21670 -372 -21671 0
 21668  21669 -21670 -372  21672 0
 21668  21669 -21670 -372 -21673 0

c  2+1 --> break 
c    (-b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧  p_372) -> break
c  in CNF:
c     b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 21668 -21669  21670 -372 1162 0


c  2-1 --> 1
c    (-b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧ -p_372) -> (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0)
c  in CNF:
c     b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_2
c     b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_1
c     b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨  b^{186, 3}_0
c  in DIMACS:
 21668 -21669  21670  372 -21671 0
 21668 -21669  21670  372 -21672 0
 21668 -21669  21670  372  21673 0

c  1-1 --> 0
c    (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0 ∧ -p_372) -> (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧ -b^{186, 3}_0)
c  in CNF:
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_2
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_1
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_0
c  in DIMACS:
 21668  21669 -21670  372 -21671 0
 21668  21669 -21670  372 -21672 0
 21668  21669 -21670  372 -21673 0

c  0-1 --> -1
c    (-b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧ -p_372) -> ( b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0)
c  in CNF:
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨  b^{186, 3}_2
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_1
c     b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨  b^{186, 3}_0
c  in DIMACS:
 21668  21669  21670  372  21671 0
 21668  21669  21670  372 -21672 0
 21668  21669  21670  372  21673 0

c  -1-1 --> -2
c    ( b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧  b^{186, 2}_0 ∧ -p_372) -> ( b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0)
c  in CNF:
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨  b^{186, 3}_2
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨  b^{186, 3}_1
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨  p_372 ∨ -b^{186, 3}_0
c  in DIMACS:
-21668  21669 -21670  372  21671 0
-21668  21669 -21670  372  21672 0
-21668  21669 -21670  372 -21673 0

c  -2-1 --> break 
c    ( b^{186, 2}_2 ∧  b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨  b^{186, 2}_0 ∨  p_372 ∨ break
c  in DIMACS:
-21668 -21669  21670  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 2}_2 ∧ -b^{186, 2}_1 ∧ -b^{186, 2}_0 ∧ true) 
c  in CNF:
c    -b^{186, 2}_2 ∨  b^{186, 2}_1 ∨  b^{186, 2}_0 ∨ false 
c  in DIMACS:
-21668  21669  21670  0

c  3 does not represent an automaton state.
c    -(-b^{186, 2}_2 ∧  b^{186, 2}_1 ∧  b^{186, 2}_0 ∧ true) 
c  in CNF:
c     b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ false 
c  in DIMACS:
 21668 -21669 -21670  0
c  -3 does not represent an automaton state.
c    -( b^{186, 2}_2 ∧  b^{186, 2}_1 ∧  b^{186, 2}_0 ∧ true) 
c  in CNF:
c    -b^{186, 2}_2 ∨ -b^{186, 2}_1 ∨ -b^{186, 2}_0 ∨ false 
c  in DIMACS:
-21668 -21669 -21670  0

c i = 3
c  -2+1 --> -1
c    ( b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧  p_558) -> ( b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0)
c  in CNF:
c    -b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨  b^{186, 4}_2
c    -b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_1
c    -b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨  b^{186, 4}_0
c  in DIMACS:
-21671 -21672  21673 -558  21674 0
-21671 -21672  21673 -558 -21675 0
-21671 -21672  21673 -558  21676 0

c  -1+1 --> 0
c    ( b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0 ∧  p_558) -> (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧ -b^{186, 4}_0)
c  in CNF:
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_2
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_1
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_0
c  in DIMACS:
-21671  21672 -21673 -558 -21674 0
-21671  21672 -21673 -558 -21675 0
-21671  21672 -21673 -558 -21676 0

c  0+1 --> 1
c    (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧  p_558) -> (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0)
c  in CNF:
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_2
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_1
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨  b^{186, 4}_0
c  in DIMACS:
 21671  21672  21673 -558 -21674 0
 21671  21672  21673 -558 -21675 0
 21671  21672  21673 -558  21676 0

c  1+1 --> 2
c    (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0 ∧  p_558) -> (-b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0)
c  in CNF:
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_2
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨  b^{186, 4}_1
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ -p_558 ∨ -b^{186, 4}_0
c  in DIMACS:
 21671  21672 -21673 -558 -21674 0
 21671  21672 -21673 -558  21675 0
 21671  21672 -21673 -558 -21676 0

c  2+1 --> break 
c    (-b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧  p_558) -> break
c  in CNF:
c     b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 21671 -21672  21673 -558 1162 0


c  2-1 --> 1
c    (-b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧ -p_558) -> (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0)
c  in CNF:
c     b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_2
c     b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_1
c     b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨  b^{186, 4}_0
c  in DIMACS:
 21671 -21672  21673  558 -21674 0
 21671 -21672  21673  558 -21675 0
 21671 -21672  21673  558  21676 0

c  1-1 --> 0
c    (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0 ∧ -p_558) -> (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧ -b^{186, 4}_0)
c  in CNF:
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_2
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_1
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_0
c  in DIMACS:
 21671  21672 -21673  558 -21674 0
 21671  21672 -21673  558 -21675 0
 21671  21672 -21673  558 -21676 0

c  0-1 --> -1
c    (-b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧ -p_558) -> ( b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0)
c  in CNF:
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨  b^{186, 4}_2
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_1
c     b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨  b^{186, 4}_0
c  in DIMACS:
 21671  21672  21673  558  21674 0
 21671  21672  21673  558 -21675 0
 21671  21672  21673  558  21676 0

c  -1-1 --> -2
c    ( b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧  b^{186, 3}_0 ∧ -p_558) -> ( b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0)
c  in CNF:
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨  b^{186, 4}_2
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨  b^{186, 4}_1
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨  p_558 ∨ -b^{186, 4}_0
c  in DIMACS:
-21671  21672 -21673  558  21674 0
-21671  21672 -21673  558  21675 0
-21671  21672 -21673  558 -21676 0

c  -2-1 --> break 
c    ( b^{186, 3}_2 ∧  b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨  b^{186, 3}_0 ∨  p_558 ∨ break
c  in DIMACS:
-21671 -21672  21673  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 3}_2 ∧ -b^{186, 3}_1 ∧ -b^{186, 3}_0 ∧ true) 
c  in CNF:
c    -b^{186, 3}_2 ∨  b^{186, 3}_1 ∨  b^{186, 3}_0 ∨ false 
c  in DIMACS:
-21671  21672  21673  0

c  3 does not represent an automaton state.
c    -(-b^{186, 3}_2 ∧  b^{186, 3}_1 ∧  b^{186, 3}_0 ∧ true) 
c  in CNF:
c     b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ false 
c  in DIMACS:
 21671 -21672 -21673  0
c  -3 does not represent an automaton state.
c    -( b^{186, 3}_2 ∧  b^{186, 3}_1 ∧  b^{186, 3}_0 ∧ true) 
c  in CNF:
c    -b^{186, 3}_2 ∨ -b^{186, 3}_1 ∨ -b^{186, 3}_0 ∨ false 
c  in DIMACS:
-21671 -21672 -21673  0

c i = 4
c  -2+1 --> -1
c    ( b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧  p_744) -> ( b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0)
c  in CNF:
c    -b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨  b^{186, 5}_2
c    -b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_1
c    -b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨  b^{186, 5}_0
c  in DIMACS:
-21674 -21675  21676 -744  21677 0
-21674 -21675  21676 -744 -21678 0
-21674 -21675  21676 -744  21679 0

c  -1+1 --> 0
c    ( b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0 ∧  p_744) -> (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧ -b^{186, 5}_0)
c  in CNF:
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_2
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_1
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_0
c  in DIMACS:
-21674  21675 -21676 -744 -21677 0
-21674  21675 -21676 -744 -21678 0
-21674  21675 -21676 -744 -21679 0

c  0+1 --> 1
c    (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧  p_744) -> (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0)
c  in CNF:
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_2
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_1
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨  b^{186, 5}_0
c  in DIMACS:
 21674  21675  21676 -744 -21677 0
 21674  21675  21676 -744 -21678 0
 21674  21675  21676 -744  21679 0

c  1+1 --> 2
c    (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0 ∧  p_744) -> (-b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0)
c  in CNF:
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_2
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨  b^{186, 5}_1
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ -p_744 ∨ -b^{186, 5}_0
c  in DIMACS:
 21674  21675 -21676 -744 -21677 0
 21674  21675 -21676 -744  21678 0
 21674  21675 -21676 -744 -21679 0

c  2+1 --> break 
c    (-b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧  p_744) -> break
c  in CNF:
c     b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 21674 -21675  21676 -744 1162 0


c  2-1 --> 1
c    (-b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧ -p_744) -> (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0)
c  in CNF:
c     b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_2
c     b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_1
c     b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨  b^{186, 5}_0
c  in DIMACS:
 21674 -21675  21676  744 -21677 0
 21674 -21675  21676  744 -21678 0
 21674 -21675  21676  744  21679 0

c  1-1 --> 0
c    (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0 ∧ -p_744) -> (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧ -b^{186, 5}_0)
c  in CNF:
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_2
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_1
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_0
c  in DIMACS:
 21674  21675 -21676  744 -21677 0
 21674  21675 -21676  744 -21678 0
 21674  21675 -21676  744 -21679 0

c  0-1 --> -1
c    (-b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧ -p_744) -> ( b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0)
c  in CNF:
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨  b^{186, 5}_2
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_1
c     b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨  b^{186, 5}_0
c  in DIMACS:
 21674  21675  21676  744  21677 0
 21674  21675  21676  744 -21678 0
 21674  21675  21676  744  21679 0

c  -1-1 --> -2
c    ( b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧  b^{186, 4}_0 ∧ -p_744) -> ( b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0)
c  in CNF:
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨  b^{186, 5}_2
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨  b^{186, 5}_1
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨  p_744 ∨ -b^{186, 5}_0
c  in DIMACS:
-21674  21675 -21676  744  21677 0
-21674  21675 -21676  744  21678 0
-21674  21675 -21676  744 -21679 0

c  -2-1 --> break 
c    ( b^{186, 4}_2 ∧  b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨  b^{186, 4}_0 ∨  p_744 ∨ break
c  in DIMACS:
-21674 -21675  21676  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 4}_2 ∧ -b^{186, 4}_1 ∧ -b^{186, 4}_0 ∧ true) 
c  in CNF:
c    -b^{186, 4}_2 ∨  b^{186, 4}_1 ∨  b^{186, 4}_0 ∨ false 
c  in DIMACS:
-21674  21675  21676  0

c  3 does not represent an automaton state.
c    -(-b^{186, 4}_2 ∧  b^{186, 4}_1 ∧  b^{186, 4}_0 ∧ true) 
c  in CNF:
c     b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ false 
c  in DIMACS:
 21674 -21675 -21676  0
c  -3 does not represent an automaton state.
c    -( b^{186, 4}_2 ∧  b^{186, 4}_1 ∧  b^{186, 4}_0 ∧ true) 
c  in CNF:
c    -b^{186, 4}_2 ∨ -b^{186, 4}_1 ∨ -b^{186, 4}_0 ∨ false 
c  in DIMACS:
-21674 -21675 -21676  0

c i = 5
c  -2+1 --> -1
c    ( b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧  p_930) -> ( b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0)
c  in CNF:
c    -b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨  b^{186, 6}_2
c    -b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_1
c    -b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨  b^{186, 6}_0
c  in DIMACS:
-21677 -21678  21679 -930  21680 0
-21677 -21678  21679 -930 -21681 0
-21677 -21678  21679 -930  21682 0

c  -1+1 --> 0
c    ( b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0 ∧  p_930) -> (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧ -b^{186, 6}_0)
c  in CNF:
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_2
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_1
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_0
c  in DIMACS:
-21677  21678 -21679 -930 -21680 0
-21677  21678 -21679 -930 -21681 0
-21677  21678 -21679 -930 -21682 0

c  0+1 --> 1
c    (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧  p_930) -> (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0)
c  in CNF:
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_2
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_1
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨  b^{186, 6}_0
c  in DIMACS:
 21677  21678  21679 -930 -21680 0
 21677  21678  21679 -930 -21681 0
 21677  21678  21679 -930  21682 0

c  1+1 --> 2
c    (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0 ∧  p_930) -> (-b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0)
c  in CNF:
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_2
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨  b^{186, 6}_1
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ -p_930 ∨ -b^{186, 6}_0
c  in DIMACS:
 21677  21678 -21679 -930 -21680 0
 21677  21678 -21679 -930  21681 0
 21677  21678 -21679 -930 -21682 0

c  2+1 --> break 
c    (-b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧  p_930) -> break
c  in CNF:
c     b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 21677 -21678  21679 -930 1162 0


c  2-1 --> 1
c    (-b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧ -p_930) -> (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0)
c  in CNF:
c     b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_2
c     b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_1
c     b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨  b^{186, 6}_0
c  in DIMACS:
 21677 -21678  21679  930 -21680 0
 21677 -21678  21679  930 -21681 0
 21677 -21678  21679  930  21682 0

c  1-1 --> 0
c    (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0 ∧ -p_930) -> (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧ -b^{186, 6}_0)
c  in CNF:
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_2
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_1
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_0
c  in DIMACS:
 21677  21678 -21679  930 -21680 0
 21677  21678 -21679  930 -21681 0
 21677  21678 -21679  930 -21682 0

c  0-1 --> -1
c    (-b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧ -p_930) -> ( b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0)
c  in CNF:
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨  b^{186, 6}_2
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_1
c     b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨  b^{186, 6}_0
c  in DIMACS:
 21677  21678  21679  930  21680 0
 21677  21678  21679  930 -21681 0
 21677  21678  21679  930  21682 0

c  -1-1 --> -2
c    ( b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧  b^{186, 5}_0 ∧ -p_930) -> ( b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0)
c  in CNF:
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨  b^{186, 6}_2
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨  b^{186, 6}_1
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨  p_930 ∨ -b^{186, 6}_0
c  in DIMACS:
-21677  21678 -21679  930  21680 0
-21677  21678 -21679  930  21681 0
-21677  21678 -21679  930 -21682 0

c  -2-1 --> break 
c    ( b^{186, 5}_2 ∧  b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨  b^{186, 5}_0 ∨  p_930 ∨ break
c  in DIMACS:
-21677 -21678  21679  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 5}_2 ∧ -b^{186, 5}_1 ∧ -b^{186, 5}_0 ∧ true) 
c  in CNF:
c    -b^{186, 5}_2 ∨  b^{186, 5}_1 ∨  b^{186, 5}_0 ∨ false 
c  in DIMACS:
-21677  21678  21679  0

c  3 does not represent an automaton state.
c    -(-b^{186, 5}_2 ∧  b^{186, 5}_1 ∧  b^{186, 5}_0 ∧ true) 
c  in CNF:
c     b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ false 
c  in DIMACS:
 21677 -21678 -21679  0
c  -3 does not represent an automaton state.
c    -( b^{186, 5}_2 ∧  b^{186, 5}_1 ∧  b^{186, 5}_0 ∧ true) 
c  in CNF:
c    -b^{186, 5}_2 ∨ -b^{186, 5}_1 ∨ -b^{186, 5}_0 ∨ false 
c  in DIMACS:
-21677 -21678 -21679  0

c i = 6
c  -2+1 --> -1
c    ( b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧  p_1116) -> ( b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧  b^{186, 7}_0)
c  in CNF:
c    -b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨  b^{186, 7}_2
c    -b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_1
c    -b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨  b^{186, 7}_0
c  in DIMACS:
-21680 -21681  21682 -1116  21683 0
-21680 -21681  21682 -1116 -21684 0
-21680 -21681  21682 -1116  21685 0

c  -1+1 --> 0
c    ( b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0 ∧  p_1116) -> (-b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧ -b^{186, 7}_0)
c  in CNF:
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_2
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_1
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_0
c  in DIMACS:
-21680  21681 -21682 -1116 -21683 0
-21680  21681 -21682 -1116 -21684 0
-21680  21681 -21682 -1116 -21685 0

c  0+1 --> 1
c    (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧  p_1116) -> (-b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧  b^{186, 7}_0)
c  in CNF:
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_2
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_1
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨  b^{186, 7}_0
c  in DIMACS:
 21680  21681  21682 -1116 -21683 0
 21680  21681  21682 -1116 -21684 0
 21680  21681  21682 -1116  21685 0

c  1+1 --> 2
c    (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0 ∧  p_1116) -> (-b^{186, 7}_2 ∧  b^{186, 7}_1 ∧ -b^{186, 7}_0)
c  in CNF:
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_2
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨  b^{186, 7}_1
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ -p_1116 ∨ -b^{186, 7}_0
c  in DIMACS:
 21680  21681 -21682 -1116 -21683 0
 21680  21681 -21682 -1116  21684 0
 21680  21681 -21682 -1116 -21685 0

c  2+1 --> break 
c    (-b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 21680 -21681  21682 -1116 1162 0


c  2-1 --> 1
c    (-b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧ -p_1116) -> (-b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧  b^{186, 7}_0)
c  in CNF:
c     b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_2
c     b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_1
c     b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨  b^{186, 7}_0
c  in DIMACS:
 21680 -21681  21682  1116 -21683 0
 21680 -21681  21682  1116 -21684 0
 21680 -21681  21682  1116  21685 0

c  1-1 --> 0
c    (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0 ∧ -p_1116) -> (-b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧ -b^{186, 7}_0)
c  in CNF:
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_2
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_1
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_0
c  in DIMACS:
 21680  21681 -21682  1116 -21683 0
 21680  21681 -21682  1116 -21684 0
 21680  21681 -21682  1116 -21685 0

c  0-1 --> -1
c    (-b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧ -p_1116) -> ( b^{186, 7}_2 ∧ -b^{186, 7}_1 ∧  b^{186, 7}_0)
c  in CNF:
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨  b^{186, 7}_2
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_1
c     b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨  b^{186, 7}_0
c  in DIMACS:
 21680  21681  21682  1116  21683 0
 21680  21681  21682  1116 -21684 0
 21680  21681  21682  1116  21685 0

c  -1-1 --> -2
c    ( b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧  b^{186, 6}_0 ∧ -p_1116) -> ( b^{186, 7}_2 ∧  b^{186, 7}_1 ∧ -b^{186, 7}_0)
c  in CNF:
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨  b^{186, 7}_2
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨  b^{186, 7}_1
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨  p_1116 ∨ -b^{186, 7}_0
c  in DIMACS:
-21680  21681 -21682  1116  21683 0
-21680  21681 -21682  1116  21684 0
-21680  21681 -21682  1116 -21685 0

c  -2-1 --> break 
c    ( b^{186, 6}_2 ∧  b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨  b^{186, 6}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-21680 -21681  21682  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{186, 6}_2 ∧ -b^{186, 6}_1 ∧ -b^{186, 6}_0 ∧ true) 
c  in CNF:
c    -b^{186, 6}_2 ∨  b^{186, 6}_1 ∨  b^{186, 6}_0 ∨ false 
c  in DIMACS:
-21680  21681  21682  0

c  3 does not represent an automaton state.
c    -(-b^{186, 6}_2 ∧  b^{186, 6}_1 ∧  b^{186, 6}_0 ∧ true) 
c  in CNF:
c     b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ false 
c  in DIMACS:
 21680 -21681 -21682  0
c  -3 does not represent an automaton state.
c    -( b^{186, 6}_2 ∧  b^{186, 6}_1 ∧  b^{186, 6}_0 ∧ true) 
c  in CNF:
c    -b^{186, 6}_2 ∨ -b^{186, 6}_1 ∨ -b^{186, 6}_0 ∨ false 
c  in DIMACS:
-21680 -21681 -21682  0

c INIT for k = 187
c    -b^{187, 1}_2
c    -b^{187, 1}_1
c    -b^{187, 1}_0
c  in DIMACS:
-21686 0
-21687 0
-21688 0

c Transitions for k = 187
c i = 1
c  -2+1 --> -1
c    ( b^{187, 1}_2 ∧  b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧  p_187) -> ( b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0)
c  in CNF:
c    -b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨  b^{187, 2}_2
c    -b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_1
c    -b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨  b^{187, 2}_0
c  in DIMACS:
-21686 -21687  21688 -187  21689 0
-21686 -21687  21688 -187 -21690 0
-21686 -21687  21688 -187  21691 0

c  -1+1 --> 0
c    ( b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧  b^{187, 1}_0 ∧  p_187) -> (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧ -b^{187, 2}_0)
c  in CNF:
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_2
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_1
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_0
c  in DIMACS:
-21686  21687 -21688 -187 -21689 0
-21686  21687 -21688 -187 -21690 0
-21686  21687 -21688 -187 -21691 0

c  0+1 --> 1
c    (-b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧  p_187) -> (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0)
c  in CNF:
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_2
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_1
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨  b^{187, 2}_0
c  in DIMACS:
 21686  21687  21688 -187 -21689 0
 21686  21687  21688 -187 -21690 0
 21686  21687  21688 -187  21691 0

c  1+1 --> 2
c    (-b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧  b^{187, 1}_0 ∧  p_187) -> (-b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0)
c  in CNF:
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_2
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨  b^{187, 2}_1
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ -p_187 ∨ -b^{187, 2}_0
c  in DIMACS:
 21686  21687 -21688 -187 -21689 0
 21686  21687 -21688 -187  21690 0
 21686  21687 -21688 -187 -21691 0

c  2+1 --> break 
c    (-b^{187, 1}_2 ∧  b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧  p_187) -> break
c  in CNF:
c     b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ -p_187 ∨ break
c  in DIMACS:
 21686 -21687  21688 -187 1162 0


c  2-1 --> 1
c    (-b^{187, 1}_2 ∧  b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧ -p_187) -> (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0)
c  in CNF:
c     b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_2
c     b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_1
c     b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨  b^{187, 2}_0
c  in DIMACS:
 21686 -21687  21688  187 -21689 0
 21686 -21687  21688  187 -21690 0
 21686 -21687  21688  187  21691 0

c  1-1 --> 0
c    (-b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧  b^{187, 1}_0 ∧ -p_187) -> (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧ -b^{187, 2}_0)
c  in CNF:
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_2
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_1
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_0
c  in DIMACS:
 21686  21687 -21688  187 -21689 0
 21686  21687 -21688  187 -21690 0
 21686  21687 -21688  187 -21691 0

c  0-1 --> -1
c    (-b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧ -p_187) -> ( b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0)
c  in CNF:
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨  b^{187, 2}_2
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_1
c     b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨  b^{187, 2}_0
c  in DIMACS:
 21686  21687  21688  187  21689 0
 21686  21687  21688  187 -21690 0
 21686  21687  21688  187  21691 0

c  -1-1 --> -2
c    ( b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧  b^{187, 1}_0 ∧ -p_187) -> ( b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0)
c  in CNF:
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨  b^{187, 2}_2
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨  b^{187, 2}_1
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨  p_187 ∨ -b^{187, 2}_0
c  in DIMACS:
-21686  21687 -21688  187  21689 0
-21686  21687 -21688  187  21690 0
-21686  21687 -21688  187 -21691 0

c  -2-1 --> break 
c    ( b^{187, 1}_2 ∧  b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧ -p_187) -> break
c  in CNF:
c    -b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨  b^{187, 1}_0 ∨  p_187 ∨ break
c  in DIMACS:
-21686 -21687  21688  187 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 1}_2 ∧ -b^{187, 1}_1 ∧ -b^{187, 1}_0 ∧ true) 
c  in CNF:
c    -b^{187, 1}_2 ∨  b^{187, 1}_1 ∨  b^{187, 1}_0 ∨ false 
c  in DIMACS:
-21686  21687  21688  0

c  3 does not represent an automaton state.
c    -(-b^{187, 1}_2 ∧  b^{187, 1}_1 ∧  b^{187, 1}_0 ∧ true) 
c  in CNF:
c     b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ false 
c  in DIMACS:
 21686 -21687 -21688  0
c  -3 does not represent an automaton state.
c    -( b^{187, 1}_2 ∧  b^{187, 1}_1 ∧  b^{187, 1}_0 ∧ true) 
c  in CNF:
c    -b^{187, 1}_2 ∨ -b^{187, 1}_1 ∨ -b^{187, 1}_0 ∨ false 
c  in DIMACS:
-21686 -21687 -21688  0

c i = 2
c  -2+1 --> -1
c    ( b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧  p_374) -> ( b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0)
c  in CNF:
c    -b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨  b^{187, 3}_2
c    -b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_1
c    -b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨  b^{187, 3}_0
c  in DIMACS:
-21689 -21690  21691 -374  21692 0
-21689 -21690  21691 -374 -21693 0
-21689 -21690  21691 -374  21694 0

c  -1+1 --> 0
c    ( b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0 ∧  p_374) -> (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧ -b^{187, 3}_0)
c  in CNF:
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_2
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_1
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_0
c  in DIMACS:
-21689  21690 -21691 -374 -21692 0
-21689  21690 -21691 -374 -21693 0
-21689  21690 -21691 -374 -21694 0

c  0+1 --> 1
c    (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧  p_374) -> (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0)
c  in CNF:
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_2
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_1
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨  b^{187, 3}_0
c  in DIMACS:
 21689  21690  21691 -374 -21692 0
 21689  21690  21691 -374 -21693 0
 21689  21690  21691 -374  21694 0

c  1+1 --> 2
c    (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0 ∧  p_374) -> (-b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0)
c  in CNF:
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_2
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨  b^{187, 3}_1
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ -p_374 ∨ -b^{187, 3}_0
c  in DIMACS:
 21689  21690 -21691 -374 -21692 0
 21689  21690 -21691 -374  21693 0
 21689  21690 -21691 -374 -21694 0

c  2+1 --> break 
c    (-b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧  p_374) -> break
c  in CNF:
c     b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 21689 -21690  21691 -374 1162 0


c  2-1 --> 1
c    (-b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧ -p_374) -> (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0)
c  in CNF:
c     b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_2
c     b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_1
c     b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨  b^{187, 3}_0
c  in DIMACS:
 21689 -21690  21691  374 -21692 0
 21689 -21690  21691  374 -21693 0
 21689 -21690  21691  374  21694 0

c  1-1 --> 0
c    (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0 ∧ -p_374) -> (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧ -b^{187, 3}_0)
c  in CNF:
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_2
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_1
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_0
c  in DIMACS:
 21689  21690 -21691  374 -21692 0
 21689  21690 -21691  374 -21693 0
 21689  21690 -21691  374 -21694 0

c  0-1 --> -1
c    (-b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧ -p_374) -> ( b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0)
c  in CNF:
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨  b^{187, 3}_2
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_1
c     b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨  b^{187, 3}_0
c  in DIMACS:
 21689  21690  21691  374  21692 0
 21689  21690  21691  374 -21693 0
 21689  21690  21691  374  21694 0

c  -1-1 --> -2
c    ( b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧  b^{187, 2}_0 ∧ -p_374) -> ( b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0)
c  in CNF:
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨  b^{187, 3}_2
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨  b^{187, 3}_1
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨  p_374 ∨ -b^{187, 3}_0
c  in DIMACS:
-21689  21690 -21691  374  21692 0
-21689  21690 -21691  374  21693 0
-21689  21690 -21691  374 -21694 0

c  -2-1 --> break 
c    ( b^{187, 2}_2 ∧  b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨  b^{187, 2}_0 ∨  p_374 ∨ break
c  in DIMACS:
-21689 -21690  21691  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 2}_2 ∧ -b^{187, 2}_1 ∧ -b^{187, 2}_0 ∧ true) 
c  in CNF:
c    -b^{187, 2}_2 ∨  b^{187, 2}_1 ∨  b^{187, 2}_0 ∨ false 
c  in DIMACS:
-21689  21690  21691  0

c  3 does not represent an automaton state.
c    -(-b^{187, 2}_2 ∧  b^{187, 2}_1 ∧  b^{187, 2}_0 ∧ true) 
c  in CNF:
c     b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ false 
c  in DIMACS:
 21689 -21690 -21691  0
c  -3 does not represent an automaton state.
c    -( b^{187, 2}_2 ∧  b^{187, 2}_1 ∧  b^{187, 2}_0 ∧ true) 
c  in CNF:
c    -b^{187, 2}_2 ∨ -b^{187, 2}_1 ∨ -b^{187, 2}_0 ∨ false 
c  in DIMACS:
-21689 -21690 -21691  0

c i = 3
c  -2+1 --> -1
c    ( b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧  p_561) -> ( b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0)
c  in CNF:
c    -b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨  b^{187, 4}_2
c    -b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_1
c    -b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨  b^{187, 4}_0
c  in DIMACS:
-21692 -21693  21694 -561  21695 0
-21692 -21693  21694 -561 -21696 0
-21692 -21693  21694 -561  21697 0

c  -1+1 --> 0
c    ( b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0 ∧  p_561) -> (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧ -b^{187, 4}_0)
c  in CNF:
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_2
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_1
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_0
c  in DIMACS:
-21692  21693 -21694 -561 -21695 0
-21692  21693 -21694 -561 -21696 0
-21692  21693 -21694 -561 -21697 0

c  0+1 --> 1
c    (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧  p_561) -> (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0)
c  in CNF:
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_2
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_1
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨  b^{187, 4}_0
c  in DIMACS:
 21692  21693  21694 -561 -21695 0
 21692  21693  21694 -561 -21696 0
 21692  21693  21694 -561  21697 0

c  1+1 --> 2
c    (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0 ∧  p_561) -> (-b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0)
c  in CNF:
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_2
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨  b^{187, 4}_1
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ -p_561 ∨ -b^{187, 4}_0
c  in DIMACS:
 21692  21693 -21694 -561 -21695 0
 21692  21693 -21694 -561  21696 0
 21692  21693 -21694 -561 -21697 0

c  2+1 --> break 
c    (-b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧  p_561) -> break
c  in CNF:
c     b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ -p_561 ∨ break
c  in DIMACS:
 21692 -21693  21694 -561 1162 0


c  2-1 --> 1
c    (-b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧ -p_561) -> (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0)
c  in CNF:
c     b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_2
c     b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_1
c     b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨  b^{187, 4}_0
c  in DIMACS:
 21692 -21693  21694  561 -21695 0
 21692 -21693  21694  561 -21696 0
 21692 -21693  21694  561  21697 0

c  1-1 --> 0
c    (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0 ∧ -p_561) -> (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧ -b^{187, 4}_0)
c  in CNF:
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_2
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_1
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_0
c  in DIMACS:
 21692  21693 -21694  561 -21695 0
 21692  21693 -21694  561 -21696 0
 21692  21693 -21694  561 -21697 0

c  0-1 --> -1
c    (-b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧ -p_561) -> ( b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0)
c  in CNF:
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨  b^{187, 4}_2
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_1
c     b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨  b^{187, 4}_0
c  in DIMACS:
 21692  21693  21694  561  21695 0
 21692  21693  21694  561 -21696 0
 21692  21693  21694  561  21697 0

c  -1-1 --> -2
c    ( b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧  b^{187, 3}_0 ∧ -p_561) -> ( b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0)
c  in CNF:
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨  b^{187, 4}_2
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨  b^{187, 4}_1
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨  p_561 ∨ -b^{187, 4}_0
c  in DIMACS:
-21692  21693 -21694  561  21695 0
-21692  21693 -21694  561  21696 0
-21692  21693 -21694  561 -21697 0

c  -2-1 --> break 
c    ( b^{187, 3}_2 ∧  b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧ -p_561) -> break
c  in CNF:
c    -b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨  b^{187, 3}_0 ∨  p_561 ∨ break
c  in DIMACS:
-21692 -21693  21694  561 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 3}_2 ∧ -b^{187, 3}_1 ∧ -b^{187, 3}_0 ∧ true) 
c  in CNF:
c    -b^{187, 3}_2 ∨  b^{187, 3}_1 ∨  b^{187, 3}_0 ∨ false 
c  in DIMACS:
-21692  21693  21694  0

c  3 does not represent an automaton state.
c    -(-b^{187, 3}_2 ∧  b^{187, 3}_1 ∧  b^{187, 3}_0 ∧ true) 
c  in CNF:
c     b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ false 
c  in DIMACS:
 21692 -21693 -21694  0
c  -3 does not represent an automaton state.
c    -( b^{187, 3}_2 ∧  b^{187, 3}_1 ∧  b^{187, 3}_0 ∧ true) 
c  in CNF:
c    -b^{187, 3}_2 ∨ -b^{187, 3}_1 ∨ -b^{187, 3}_0 ∨ false 
c  in DIMACS:
-21692 -21693 -21694  0

c i = 4
c  -2+1 --> -1
c    ( b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧  p_748) -> ( b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0)
c  in CNF:
c    -b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨  b^{187, 5}_2
c    -b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_1
c    -b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨  b^{187, 5}_0
c  in DIMACS:
-21695 -21696  21697 -748  21698 0
-21695 -21696  21697 -748 -21699 0
-21695 -21696  21697 -748  21700 0

c  -1+1 --> 0
c    ( b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0 ∧  p_748) -> (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧ -b^{187, 5}_0)
c  in CNF:
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_2
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_1
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_0
c  in DIMACS:
-21695  21696 -21697 -748 -21698 0
-21695  21696 -21697 -748 -21699 0
-21695  21696 -21697 -748 -21700 0

c  0+1 --> 1
c    (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧  p_748) -> (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0)
c  in CNF:
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_2
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_1
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨  b^{187, 5}_0
c  in DIMACS:
 21695  21696  21697 -748 -21698 0
 21695  21696  21697 -748 -21699 0
 21695  21696  21697 -748  21700 0

c  1+1 --> 2
c    (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0 ∧  p_748) -> (-b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0)
c  in CNF:
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_2
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨  b^{187, 5}_1
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ -p_748 ∨ -b^{187, 5}_0
c  in DIMACS:
 21695  21696 -21697 -748 -21698 0
 21695  21696 -21697 -748  21699 0
 21695  21696 -21697 -748 -21700 0

c  2+1 --> break 
c    (-b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧  p_748) -> break
c  in CNF:
c     b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 21695 -21696  21697 -748 1162 0


c  2-1 --> 1
c    (-b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧ -p_748) -> (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0)
c  in CNF:
c     b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_2
c     b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_1
c     b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨  b^{187, 5}_0
c  in DIMACS:
 21695 -21696  21697  748 -21698 0
 21695 -21696  21697  748 -21699 0
 21695 -21696  21697  748  21700 0

c  1-1 --> 0
c    (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0 ∧ -p_748) -> (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧ -b^{187, 5}_0)
c  in CNF:
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_2
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_1
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_0
c  in DIMACS:
 21695  21696 -21697  748 -21698 0
 21695  21696 -21697  748 -21699 0
 21695  21696 -21697  748 -21700 0

c  0-1 --> -1
c    (-b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧ -p_748) -> ( b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0)
c  in CNF:
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨  b^{187, 5}_2
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_1
c     b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨  b^{187, 5}_0
c  in DIMACS:
 21695  21696  21697  748  21698 0
 21695  21696  21697  748 -21699 0
 21695  21696  21697  748  21700 0

c  -1-1 --> -2
c    ( b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧  b^{187, 4}_0 ∧ -p_748) -> ( b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0)
c  in CNF:
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨  b^{187, 5}_2
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨  b^{187, 5}_1
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨  p_748 ∨ -b^{187, 5}_0
c  in DIMACS:
-21695  21696 -21697  748  21698 0
-21695  21696 -21697  748  21699 0
-21695  21696 -21697  748 -21700 0

c  -2-1 --> break 
c    ( b^{187, 4}_2 ∧  b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨  b^{187, 4}_0 ∨  p_748 ∨ break
c  in DIMACS:
-21695 -21696  21697  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 4}_2 ∧ -b^{187, 4}_1 ∧ -b^{187, 4}_0 ∧ true) 
c  in CNF:
c    -b^{187, 4}_2 ∨  b^{187, 4}_1 ∨  b^{187, 4}_0 ∨ false 
c  in DIMACS:
-21695  21696  21697  0

c  3 does not represent an automaton state.
c    -(-b^{187, 4}_2 ∧  b^{187, 4}_1 ∧  b^{187, 4}_0 ∧ true) 
c  in CNF:
c     b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ false 
c  in DIMACS:
 21695 -21696 -21697  0
c  -3 does not represent an automaton state.
c    -( b^{187, 4}_2 ∧  b^{187, 4}_1 ∧  b^{187, 4}_0 ∧ true) 
c  in CNF:
c    -b^{187, 4}_2 ∨ -b^{187, 4}_1 ∨ -b^{187, 4}_0 ∨ false 
c  in DIMACS:
-21695 -21696 -21697  0

c i = 5
c  -2+1 --> -1
c    ( b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧  p_935) -> ( b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0)
c  in CNF:
c    -b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨  b^{187, 6}_2
c    -b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_1
c    -b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨  b^{187, 6}_0
c  in DIMACS:
-21698 -21699  21700 -935  21701 0
-21698 -21699  21700 -935 -21702 0
-21698 -21699  21700 -935  21703 0

c  -1+1 --> 0
c    ( b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0 ∧  p_935) -> (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧ -b^{187, 6}_0)
c  in CNF:
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_2
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_1
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_0
c  in DIMACS:
-21698  21699 -21700 -935 -21701 0
-21698  21699 -21700 -935 -21702 0
-21698  21699 -21700 -935 -21703 0

c  0+1 --> 1
c    (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧  p_935) -> (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0)
c  in CNF:
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_2
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_1
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨  b^{187, 6}_0
c  in DIMACS:
 21698  21699  21700 -935 -21701 0
 21698  21699  21700 -935 -21702 0
 21698  21699  21700 -935  21703 0

c  1+1 --> 2
c    (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0 ∧  p_935) -> (-b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0)
c  in CNF:
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_2
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨  b^{187, 6}_1
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ -p_935 ∨ -b^{187, 6}_0
c  in DIMACS:
 21698  21699 -21700 -935 -21701 0
 21698  21699 -21700 -935  21702 0
 21698  21699 -21700 -935 -21703 0

c  2+1 --> break 
c    (-b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧  p_935) -> break
c  in CNF:
c     b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ -p_935 ∨ break
c  in DIMACS:
 21698 -21699  21700 -935 1162 0


c  2-1 --> 1
c    (-b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧ -p_935) -> (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0)
c  in CNF:
c     b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_2
c     b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_1
c     b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨  b^{187, 6}_0
c  in DIMACS:
 21698 -21699  21700  935 -21701 0
 21698 -21699  21700  935 -21702 0
 21698 -21699  21700  935  21703 0

c  1-1 --> 0
c    (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0 ∧ -p_935) -> (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧ -b^{187, 6}_0)
c  in CNF:
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_2
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_1
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_0
c  in DIMACS:
 21698  21699 -21700  935 -21701 0
 21698  21699 -21700  935 -21702 0
 21698  21699 -21700  935 -21703 0

c  0-1 --> -1
c    (-b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧ -p_935) -> ( b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0)
c  in CNF:
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨  b^{187, 6}_2
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_1
c     b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨  b^{187, 6}_0
c  in DIMACS:
 21698  21699  21700  935  21701 0
 21698  21699  21700  935 -21702 0
 21698  21699  21700  935  21703 0

c  -1-1 --> -2
c    ( b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧  b^{187, 5}_0 ∧ -p_935) -> ( b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0)
c  in CNF:
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨  b^{187, 6}_2
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨  b^{187, 6}_1
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨  p_935 ∨ -b^{187, 6}_0
c  in DIMACS:
-21698  21699 -21700  935  21701 0
-21698  21699 -21700  935  21702 0
-21698  21699 -21700  935 -21703 0

c  -2-1 --> break 
c    ( b^{187, 5}_2 ∧  b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧ -p_935) -> break
c  in CNF:
c    -b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨  b^{187, 5}_0 ∨  p_935 ∨ break
c  in DIMACS:
-21698 -21699  21700  935 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 5}_2 ∧ -b^{187, 5}_1 ∧ -b^{187, 5}_0 ∧ true) 
c  in CNF:
c    -b^{187, 5}_2 ∨  b^{187, 5}_1 ∨  b^{187, 5}_0 ∨ false 
c  in DIMACS:
-21698  21699  21700  0

c  3 does not represent an automaton state.
c    -(-b^{187, 5}_2 ∧  b^{187, 5}_1 ∧  b^{187, 5}_0 ∧ true) 
c  in CNF:
c     b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ false 
c  in DIMACS:
 21698 -21699 -21700  0
c  -3 does not represent an automaton state.
c    -( b^{187, 5}_2 ∧  b^{187, 5}_1 ∧  b^{187, 5}_0 ∧ true) 
c  in CNF:
c    -b^{187, 5}_2 ∨ -b^{187, 5}_1 ∨ -b^{187, 5}_0 ∨ false 
c  in DIMACS:
-21698 -21699 -21700  0

c i = 6
c  -2+1 --> -1
c    ( b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧  p_1122) -> ( b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧  b^{187, 7}_0)
c  in CNF:
c    -b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨  b^{187, 7}_2
c    -b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_1
c    -b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨  b^{187, 7}_0
c  in DIMACS:
-21701 -21702  21703 -1122  21704 0
-21701 -21702  21703 -1122 -21705 0
-21701 -21702  21703 -1122  21706 0

c  -1+1 --> 0
c    ( b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0 ∧  p_1122) -> (-b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧ -b^{187, 7}_0)
c  in CNF:
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_2
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_1
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_0
c  in DIMACS:
-21701  21702 -21703 -1122 -21704 0
-21701  21702 -21703 -1122 -21705 0
-21701  21702 -21703 -1122 -21706 0

c  0+1 --> 1
c    (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧  p_1122) -> (-b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧  b^{187, 7}_0)
c  in CNF:
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_2
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_1
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨  b^{187, 7}_0
c  in DIMACS:
 21701  21702  21703 -1122 -21704 0
 21701  21702  21703 -1122 -21705 0
 21701  21702  21703 -1122  21706 0

c  1+1 --> 2
c    (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0 ∧  p_1122) -> (-b^{187, 7}_2 ∧  b^{187, 7}_1 ∧ -b^{187, 7}_0)
c  in CNF:
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_2
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨  b^{187, 7}_1
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ -p_1122 ∨ -b^{187, 7}_0
c  in DIMACS:
 21701  21702 -21703 -1122 -21704 0
 21701  21702 -21703 -1122  21705 0
 21701  21702 -21703 -1122 -21706 0

c  2+1 --> break 
c    (-b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 21701 -21702  21703 -1122 1162 0


c  2-1 --> 1
c    (-b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧ -p_1122) -> (-b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧  b^{187, 7}_0)
c  in CNF:
c     b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_2
c     b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_1
c     b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨  b^{187, 7}_0
c  in DIMACS:
 21701 -21702  21703  1122 -21704 0
 21701 -21702  21703  1122 -21705 0
 21701 -21702  21703  1122  21706 0

c  1-1 --> 0
c    (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0 ∧ -p_1122) -> (-b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧ -b^{187, 7}_0)
c  in CNF:
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_2
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_1
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_0
c  in DIMACS:
 21701  21702 -21703  1122 -21704 0
 21701  21702 -21703  1122 -21705 0
 21701  21702 -21703  1122 -21706 0

c  0-1 --> -1
c    (-b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧ -p_1122) -> ( b^{187, 7}_2 ∧ -b^{187, 7}_1 ∧  b^{187, 7}_0)
c  in CNF:
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨  b^{187, 7}_2
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_1
c     b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨  b^{187, 7}_0
c  in DIMACS:
 21701  21702  21703  1122  21704 0
 21701  21702  21703  1122 -21705 0
 21701  21702  21703  1122  21706 0

c  -1-1 --> -2
c    ( b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧  b^{187, 6}_0 ∧ -p_1122) -> ( b^{187, 7}_2 ∧  b^{187, 7}_1 ∧ -b^{187, 7}_0)
c  in CNF:
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨  b^{187, 7}_2
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨  b^{187, 7}_1
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨  p_1122 ∨ -b^{187, 7}_0
c  in DIMACS:
-21701  21702 -21703  1122  21704 0
-21701  21702 -21703  1122  21705 0
-21701  21702 -21703  1122 -21706 0

c  -2-1 --> break 
c    ( b^{187, 6}_2 ∧  b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨  b^{187, 6}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-21701 -21702  21703  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{187, 6}_2 ∧ -b^{187, 6}_1 ∧ -b^{187, 6}_0 ∧ true) 
c  in CNF:
c    -b^{187, 6}_2 ∨  b^{187, 6}_1 ∨  b^{187, 6}_0 ∨ false 
c  in DIMACS:
-21701  21702  21703  0

c  3 does not represent an automaton state.
c    -(-b^{187, 6}_2 ∧  b^{187, 6}_1 ∧  b^{187, 6}_0 ∧ true) 
c  in CNF:
c     b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ false 
c  in DIMACS:
 21701 -21702 -21703  0
c  -3 does not represent an automaton state.
c    -( b^{187, 6}_2 ∧  b^{187, 6}_1 ∧  b^{187, 6}_0 ∧ true) 
c  in CNF:
c    -b^{187, 6}_2 ∨ -b^{187, 6}_1 ∨ -b^{187, 6}_0 ∨ false 
c  in DIMACS:
-21701 -21702 -21703  0

c INIT for k = 188
c    -b^{188, 1}_2
c    -b^{188, 1}_1
c    -b^{188, 1}_0
c  in DIMACS:
-21707 0
-21708 0
-21709 0

c Transitions for k = 188
c i = 1
c  -2+1 --> -1
c    ( b^{188, 1}_2 ∧  b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧  p_188) -> ( b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0)
c  in CNF:
c    -b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨  b^{188, 2}_2
c    -b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_1
c    -b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨  b^{188, 2}_0
c  in DIMACS:
-21707 -21708  21709 -188  21710 0
-21707 -21708  21709 -188 -21711 0
-21707 -21708  21709 -188  21712 0

c  -1+1 --> 0
c    ( b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧  b^{188, 1}_0 ∧  p_188) -> (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧ -b^{188, 2}_0)
c  in CNF:
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_2
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_1
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_0
c  in DIMACS:
-21707  21708 -21709 -188 -21710 0
-21707  21708 -21709 -188 -21711 0
-21707  21708 -21709 -188 -21712 0

c  0+1 --> 1
c    (-b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧  p_188) -> (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0)
c  in CNF:
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_2
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_1
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨  b^{188, 2}_0
c  in DIMACS:
 21707  21708  21709 -188 -21710 0
 21707  21708  21709 -188 -21711 0
 21707  21708  21709 -188  21712 0

c  1+1 --> 2
c    (-b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧  b^{188, 1}_0 ∧  p_188) -> (-b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0)
c  in CNF:
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_2
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨  b^{188, 2}_1
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ -p_188 ∨ -b^{188, 2}_0
c  in DIMACS:
 21707  21708 -21709 -188 -21710 0
 21707  21708 -21709 -188  21711 0
 21707  21708 -21709 -188 -21712 0

c  2+1 --> break 
c    (-b^{188, 1}_2 ∧  b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧  p_188) -> break
c  in CNF:
c     b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ -p_188 ∨ break
c  in DIMACS:
 21707 -21708  21709 -188 1162 0


c  2-1 --> 1
c    (-b^{188, 1}_2 ∧  b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧ -p_188) -> (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0)
c  in CNF:
c     b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_2
c     b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_1
c     b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨  b^{188, 2}_0
c  in DIMACS:
 21707 -21708  21709  188 -21710 0
 21707 -21708  21709  188 -21711 0
 21707 -21708  21709  188  21712 0

c  1-1 --> 0
c    (-b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧  b^{188, 1}_0 ∧ -p_188) -> (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧ -b^{188, 2}_0)
c  in CNF:
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_2
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_1
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_0
c  in DIMACS:
 21707  21708 -21709  188 -21710 0
 21707  21708 -21709  188 -21711 0
 21707  21708 -21709  188 -21712 0

c  0-1 --> -1
c    (-b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧ -p_188) -> ( b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0)
c  in CNF:
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨  b^{188, 2}_2
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_1
c     b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨  b^{188, 2}_0
c  in DIMACS:
 21707  21708  21709  188  21710 0
 21707  21708  21709  188 -21711 0
 21707  21708  21709  188  21712 0

c  -1-1 --> -2
c    ( b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧  b^{188, 1}_0 ∧ -p_188) -> ( b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0)
c  in CNF:
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨  b^{188, 2}_2
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨  b^{188, 2}_1
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨  p_188 ∨ -b^{188, 2}_0
c  in DIMACS:
-21707  21708 -21709  188  21710 0
-21707  21708 -21709  188  21711 0
-21707  21708 -21709  188 -21712 0

c  -2-1 --> break 
c    ( b^{188, 1}_2 ∧  b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧ -p_188) -> break
c  in CNF:
c    -b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨  b^{188, 1}_0 ∨  p_188 ∨ break
c  in DIMACS:
-21707 -21708  21709  188 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 1}_2 ∧ -b^{188, 1}_1 ∧ -b^{188, 1}_0 ∧ true) 
c  in CNF:
c    -b^{188, 1}_2 ∨  b^{188, 1}_1 ∨  b^{188, 1}_0 ∨ false 
c  in DIMACS:
-21707  21708  21709  0

c  3 does not represent an automaton state.
c    -(-b^{188, 1}_2 ∧  b^{188, 1}_1 ∧  b^{188, 1}_0 ∧ true) 
c  in CNF:
c     b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ false 
c  in DIMACS:
 21707 -21708 -21709  0
c  -3 does not represent an automaton state.
c    -( b^{188, 1}_2 ∧  b^{188, 1}_1 ∧  b^{188, 1}_0 ∧ true) 
c  in CNF:
c    -b^{188, 1}_2 ∨ -b^{188, 1}_1 ∨ -b^{188, 1}_0 ∨ false 
c  in DIMACS:
-21707 -21708 -21709  0

c i = 2
c  -2+1 --> -1
c    ( b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧  p_376) -> ( b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0)
c  in CNF:
c    -b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨  b^{188, 3}_2
c    -b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_1
c    -b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨  b^{188, 3}_0
c  in DIMACS:
-21710 -21711  21712 -376  21713 0
-21710 -21711  21712 -376 -21714 0
-21710 -21711  21712 -376  21715 0

c  -1+1 --> 0
c    ( b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0 ∧  p_376) -> (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧ -b^{188, 3}_0)
c  in CNF:
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_2
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_1
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_0
c  in DIMACS:
-21710  21711 -21712 -376 -21713 0
-21710  21711 -21712 -376 -21714 0
-21710  21711 -21712 -376 -21715 0

c  0+1 --> 1
c    (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧  p_376) -> (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0)
c  in CNF:
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_2
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_1
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨  b^{188, 3}_0
c  in DIMACS:
 21710  21711  21712 -376 -21713 0
 21710  21711  21712 -376 -21714 0
 21710  21711  21712 -376  21715 0

c  1+1 --> 2
c    (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0 ∧  p_376) -> (-b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0)
c  in CNF:
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_2
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨  b^{188, 3}_1
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ -p_376 ∨ -b^{188, 3}_0
c  in DIMACS:
 21710  21711 -21712 -376 -21713 0
 21710  21711 -21712 -376  21714 0
 21710  21711 -21712 -376 -21715 0

c  2+1 --> break 
c    (-b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧  p_376) -> break
c  in CNF:
c     b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 21710 -21711  21712 -376 1162 0


c  2-1 --> 1
c    (-b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧ -p_376) -> (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0)
c  in CNF:
c     b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_2
c     b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_1
c     b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨  b^{188, 3}_0
c  in DIMACS:
 21710 -21711  21712  376 -21713 0
 21710 -21711  21712  376 -21714 0
 21710 -21711  21712  376  21715 0

c  1-1 --> 0
c    (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0 ∧ -p_376) -> (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧ -b^{188, 3}_0)
c  in CNF:
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_2
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_1
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_0
c  in DIMACS:
 21710  21711 -21712  376 -21713 0
 21710  21711 -21712  376 -21714 0
 21710  21711 -21712  376 -21715 0

c  0-1 --> -1
c    (-b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧ -p_376) -> ( b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0)
c  in CNF:
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨  b^{188, 3}_2
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_1
c     b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨  b^{188, 3}_0
c  in DIMACS:
 21710  21711  21712  376  21713 0
 21710  21711  21712  376 -21714 0
 21710  21711  21712  376  21715 0

c  -1-1 --> -2
c    ( b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧  b^{188, 2}_0 ∧ -p_376) -> ( b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0)
c  in CNF:
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨  b^{188, 3}_2
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨  b^{188, 3}_1
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨  p_376 ∨ -b^{188, 3}_0
c  in DIMACS:
-21710  21711 -21712  376  21713 0
-21710  21711 -21712  376  21714 0
-21710  21711 -21712  376 -21715 0

c  -2-1 --> break 
c    ( b^{188, 2}_2 ∧  b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨  b^{188, 2}_0 ∨  p_376 ∨ break
c  in DIMACS:
-21710 -21711  21712  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 2}_2 ∧ -b^{188, 2}_1 ∧ -b^{188, 2}_0 ∧ true) 
c  in CNF:
c    -b^{188, 2}_2 ∨  b^{188, 2}_1 ∨  b^{188, 2}_0 ∨ false 
c  in DIMACS:
-21710  21711  21712  0

c  3 does not represent an automaton state.
c    -(-b^{188, 2}_2 ∧  b^{188, 2}_1 ∧  b^{188, 2}_0 ∧ true) 
c  in CNF:
c     b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ false 
c  in DIMACS:
 21710 -21711 -21712  0
c  -3 does not represent an automaton state.
c    -( b^{188, 2}_2 ∧  b^{188, 2}_1 ∧  b^{188, 2}_0 ∧ true) 
c  in CNF:
c    -b^{188, 2}_2 ∨ -b^{188, 2}_1 ∨ -b^{188, 2}_0 ∨ false 
c  in DIMACS:
-21710 -21711 -21712  0

c i = 3
c  -2+1 --> -1
c    ( b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧  p_564) -> ( b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0)
c  in CNF:
c    -b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨  b^{188, 4}_2
c    -b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_1
c    -b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨  b^{188, 4}_0
c  in DIMACS:
-21713 -21714  21715 -564  21716 0
-21713 -21714  21715 -564 -21717 0
-21713 -21714  21715 -564  21718 0

c  -1+1 --> 0
c    ( b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0 ∧  p_564) -> (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧ -b^{188, 4}_0)
c  in CNF:
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_2
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_1
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_0
c  in DIMACS:
-21713  21714 -21715 -564 -21716 0
-21713  21714 -21715 -564 -21717 0
-21713  21714 -21715 -564 -21718 0

c  0+1 --> 1
c    (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧  p_564) -> (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0)
c  in CNF:
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_2
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_1
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨  b^{188, 4}_0
c  in DIMACS:
 21713  21714  21715 -564 -21716 0
 21713  21714  21715 -564 -21717 0
 21713  21714  21715 -564  21718 0

c  1+1 --> 2
c    (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0 ∧  p_564) -> (-b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0)
c  in CNF:
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_2
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨  b^{188, 4}_1
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ -p_564 ∨ -b^{188, 4}_0
c  in DIMACS:
 21713  21714 -21715 -564 -21716 0
 21713  21714 -21715 -564  21717 0
 21713  21714 -21715 -564 -21718 0

c  2+1 --> break 
c    (-b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧  p_564) -> break
c  in CNF:
c     b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 21713 -21714  21715 -564 1162 0


c  2-1 --> 1
c    (-b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧ -p_564) -> (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0)
c  in CNF:
c     b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_2
c     b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_1
c     b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨  b^{188, 4}_0
c  in DIMACS:
 21713 -21714  21715  564 -21716 0
 21713 -21714  21715  564 -21717 0
 21713 -21714  21715  564  21718 0

c  1-1 --> 0
c    (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0 ∧ -p_564) -> (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧ -b^{188, 4}_0)
c  in CNF:
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_2
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_1
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_0
c  in DIMACS:
 21713  21714 -21715  564 -21716 0
 21713  21714 -21715  564 -21717 0
 21713  21714 -21715  564 -21718 0

c  0-1 --> -1
c    (-b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧ -p_564) -> ( b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0)
c  in CNF:
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨  b^{188, 4}_2
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_1
c     b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨  b^{188, 4}_0
c  in DIMACS:
 21713  21714  21715  564  21716 0
 21713  21714  21715  564 -21717 0
 21713  21714  21715  564  21718 0

c  -1-1 --> -2
c    ( b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧  b^{188, 3}_0 ∧ -p_564) -> ( b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0)
c  in CNF:
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨  b^{188, 4}_2
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨  b^{188, 4}_1
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨  p_564 ∨ -b^{188, 4}_0
c  in DIMACS:
-21713  21714 -21715  564  21716 0
-21713  21714 -21715  564  21717 0
-21713  21714 -21715  564 -21718 0

c  -2-1 --> break 
c    ( b^{188, 3}_2 ∧  b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨  b^{188, 3}_0 ∨  p_564 ∨ break
c  in DIMACS:
-21713 -21714  21715  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 3}_2 ∧ -b^{188, 3}_1 ∧ -b^{188, 3}_0 ∧ true) 
c  in CNF:
c    -b^{188, 3}_2 ∨  b^{188, 3}_1 ∨  b^{188, 3}_0 ∨ false 
c  in DIMACS:
-21713  21714  21715  0

c  3 does not represent an automaton state.
c    -(-b^{188, 3}_2 ∧  b^{188, 3}_1 ∧  b^{188, 3}_0 ∧ true) 
c  in CNF:
c     b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ false 
c  in DIMACS:
 21713 -21714 -21715  0
c  -3 does not represent an automaton state.
c    -( b^{188, 3}_2 ∧  b^{188, 3}_1 ∧  b^{188, 3}_0 ∧ true) 
c  in CNF:
c    -b^{188, 3}_2 ∨ -b^{188, 3}_1 ∨ -b^{188, 3}_0 ∨ false 
c  in DIMACS:
-21713 -21714 -21715  0

c i = 4
c  -2+1 --> -1
c    ( b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧  p_752) -> ( b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0)
c  in CNF:
c    -b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨  b^{188, 5}_2
c    -b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_1
c    -b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨  b^{188, 5}_0
c  in DIMACS:
-21716 -21717  21718 -752  21719 0
-21716 -21717  21718 -752 -21720 0
-21716 -21717  21718 -752  21721 0

c  -1+1 --> 0
c    ( b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0 ∧  p_752) -> (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧ -b^{188, 5}_0)
c  in CNF:
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_2
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_1
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_0
c  in DIMACS:
-21716  21717 -21718 -752 -21719 0
-21716  21717 -21718 -752 -21720 0
-21716  21717 -21718 -752 -21721 0

c  0+1 --> 1
c    (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧  p_752) -> (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0)
c  in CNF:
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_2
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_1
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨  b^{188, 5}_0
c  in DIMACS:
 21716  21717  21718 -752 -21719 0
 21716  21717  21718 -752 -21720 0
 21716  21717  21718 -752  21721 0

c  1+1 --> 2
c    (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0 ∧  p_752) -> (-b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0)
c  in CNF:
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_2
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨  b^{188, 5}_1
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ -p_752 ∨ -b^{188, 5}_0
c  in DIMACS:
 21716  21717 -21718 -752 -21719 0
 21716  21717 -21718 -752  21720 0
 21716  21717 -21718 -752 -21721 0

c  2+1 --> break 
c    (-b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧  p_752) -> break
c  in CNF:
c     b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 21716 -21717  21718 -752 1162 0


c  2-1 --> 1
c    (-b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧ -p_752) -> (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0)
c  in CNF:
c     b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_2
c     b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_1
c     b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨  b^{188, 5}_0
c  in DIMACS:
 21716 -21717  21718  752 -21719 0
 21716 -21717  21718  752 -21720 0
 21716 -21717  21718  752  21721 0

c  1-1 --> 0
c    (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0 ∧ -p_752) -> (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧ -b^{188, 5}_0)
c  in CNF:
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_2
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_1
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_0
c  in DIMACS:
 21716  21717 -21718  752 -21719 0
 21716  21717 -21718  752 -21720 0
 21716  21717 -21718  752 -21721 0

c  0-1 --> -1
c    (-b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧ -p_752) -> ( b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0)
c  in CNF:
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨  b^{188, 5}_2
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_1
c     b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨  b^{188, 5}_0
c  in DIMACS:
 21716  21717  21718  752  21719 0
 21716  21717  21718  752 -21720 0
 21716  21717  21718  752  21721 0

c  -1-1 --> -2
c    ( b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧  b^{188, 4}_0 ∧ -p_752) -> ( b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0)
c  in CNF:
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨  b^{188, 5}_2
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨  b^{188, 5}_1
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨  p_752 ∨ -b^{188, 5}_0
c  in DIMACS:
-21716  21717 -21718  752  21719 0
-21716  21717 -21718  752  21720 0
-21716  21717 -21718  752 -21721 0

c  -2-1 --> break 
c    ( b^{188, 4}_2 ∧  b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨  b^{188, 4}_0 ∨  p_752 ∨ break
c  in DIMACS:
-21716 -21717  21718  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 4}_2 ∧ -b^{188, 4}_1 ∧ -b^{188, 4}_0 ∧ true) 
c  in CNF:
c    -b^{188, 4}_2 ∨  b^{188, 4}_1 ∨  b^{188, 4}_0 ∨ false 
c  in DIMACS:
-21716  21717  21718  0

c  3 does not represent an automaton state.
c    -(-b^{188, 4}_2 ∧  b^{188, 4}_1 ∧  b^{188, 4}_0 ∧ true) 
c  in CNF:
c     b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ false 
c  in DIMACS:
 21716 -21717 -21718  0
c  -3 does not represent an automaton state.
c    -( b^{188, 4}_2 ∧  b^{188, 4}_1 ∧  b^{188, 4}_0 ∧ true) 
c  in CNF:
c    -b^{188, 4}_2 ∨ -b^{188, 4}_1 ∨ -b^{188, 4}_0 ∨ false 
c  in DIMACS:
-21716 -21717 -21718  0

c i = 5
c  -2+1 --> -1
c    ( b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧  p_940) -> ( b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0)
c  in CNF:
c    -b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨  b^{188, 6}_2
c    -b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_1
c    -b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨  b^{188, 6}_0
c  in DIMACS:
-21719 -21720  21721 -940  21722 0
-21719 -21720  21721 -940 -21723 0
-21719 -21720  21721 -940  21724 0

c  -1+1 --> 0
c    ( b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0 ∧  p_940) -> (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧ -b^{188, 6}_0)
c  in CNF:
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_2
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_1
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_0
c  in DIMACS:
-21719  21720 -21721 -940 -21722 0
-21719  21720 -21721 -940 -21723 0
-21719  21720 -21721 -940 -21724 0

c  0+1 --> 1
c    (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧  p_940) -> (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0)
c  in CNF:
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_2
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_1
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨  b^{188, 6}_0
c  in DIMACS:
 21719  21720  21721 -940 -21722 0
 21719  21720  21721 -940 -21723 0
 21719  21720  21721 -940  21724 0

c  1+1 --> 2
c    (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0 ∧  p_940) -> (-b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0)
c  in CNF:
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_2
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨  b^{188, 6}_1
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ -p_940 ∨ -b^{188, 6}_0
c  in DIMACS:
 21719  21720 -21721 -940 -21722 0
 21719  21720 -21721 -940  21723 0
 21719  21720 -21721 -940 -21724 0

c  2+1 --> break 
c    (-b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧  p_940) -> break
c  in CNF:
c     b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 21719 -21720  21721 -940 1162 0


c  2-1 --> 1
c    (-b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧ -p_940) -> (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0)
c  in CNF:
c     b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_2
c     b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_1
c     b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨  b^{188, 6}_0
c  in DIMACS:
 21719 -21720  21721  940 -21722 0
 21719 -21720  21721  940 -21723 0
 21719 -21720  21721  940  21724 0

c  1-1 --> 0
c    (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0 ∧ -p_940) -> (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧ -b^{188, 6}_0)
c  in CNF:
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_2
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_1
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_0
c  in DIMACS:
 21719  21720 -21721  940 -21722 0
 21719  21720 -21721  940 -21723 0
 21719  21720 -21721  940 -21724 0

c  0-1 --> -1
c    (-b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧ -p_940) -> ( b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0)
c  in CNF:
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨  b^{188, 6}_2
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_1
c     b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨  b^{188, 6}_0
c  in DIMACS:
 21719  21720  21721  940  21722 0
 21719  21720  21721  940 -21723 0
 21719  21720  21721  940  21724 0

c  -1-1 --> -2
c    ( b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧  b^{188, 5}_0 ∧ -p_940) -> ( b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0)
c  in CNF:
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨  b^{188, 6}_2
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨  b^{188, 6}_1
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨  p_940 ∨ -b^{188, 6}_0
c  in DIMACS:
-21719  21720 -21721  940  21722 0
-21719  21720 -21721  940  21723 0
-21719  21720 -21721  940 -21724 0

c  -2-1 --> break 
c    ( b^{188, 5}_2 ∧  b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨  b^{188, 5}_0 ∨  p_940 ∨ break
c  in DIMACS:
-21719 -21720  21721  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 5}_2 ∧ -b^{188, 5}_1 ∧ -b^{188, 5}_0 ∧ true) 
c  in CNF:
c    -b^{188, 5}_2 ∨  b^{188, 5}_1 ∨  b^{188, 5}_0 ∨ false 
c  in DIMACS:
-21719  21720  21721  0

c  3 does not represent an automaton state.
c    -(-b^{188, 5}_2 ∧  b^{188, 5}_1 ∧  b^{188, 5}_0 ∧ true) 
c  in CNF:
c     b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ false 
c  in DIMACS:
 21719 -21720 -21721  0
c  -3 does not represent an automaton state.
c    -( b^{188, 5}_2 ∧  b^{188, 5}_1 ∧  b^{188, 5}_0 ∧ true) 
c  in CNF:
c    -b^{188, 5}_2 ∨ -b^{188, 5}_1 ∨ -b^{188, 5}_0 ∨ false 
c  in DIMACS:
-21719 -21720 -21721  0

c i = 6
c  -2+1 --> -1
c    ( b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧  p_1128) -> ( b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧  b^{188, 7}_0)
c  in CNF:
c    -b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨  b^{188, 7}_2
c    -b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_1
c    -b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨  b^{188, 7}_0
c  in DIMACS:
-21722 -21723  21724 -1128  21725 0
-21722 -21723  21724 -1128 -21726 0
-21722 -21723  21724 -1128  21727 0

c  -1+1 --> 0
c    ( b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0 ∧  p_1128) -> (-b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧ -b^{188, 7}_0)
c  in CNF:
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_2
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_1
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_0
c  in DIMACS:
-21722  21723 -21724 -1128 -21725 0
-21722  21723 -21724 -1128 -21726 0
-21722  21723 -21724 -1128 -21727 0

c  0+1 --> 1
c    (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧  p_1128) -> (-b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧  b^{188, 7}_0)
c  in CNF:
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_2
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_1
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨  b^{188, 7}_0
c  in DIMACS:
 21722  21723  21724 -1128 -21725 0
 21722  21723  21724 -1128 -21726 0
 21722  21723  21724 -1128  21727 0

c  1+1 --> 2
c    (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0 ∧  p_1128) -> (-b^{188, 7}_2 ∧  b^{188, 7}_1 ∧ -b^{188, 7}_0)
c  in CNF:
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_2
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨  b^{188, 7}_1
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ -p_1128 ∨ -b^{188, 7}_0
c  in DIMACS:
 21722  21723 -21724 -1128 -21725 0
 21722  21723 -21724 -1128  21726 0
 21722  21723 -21724 -1128 -21727 0

c  2+1 --> break 
c    (-b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 21722 -21723  21724 -1128 1162 0


c  2-1 --> 1
c    (-b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧ -p_1128) -> (-b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧  b^{188, 7}_0)
c  in CNF:
c     b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_2
c     b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_1
c     b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨  b^{188, 7}_0
c  in DIMACS:
 21722 -21723  21724  1128 -21725 0
 21722 -21723  21724  1128 -21726 0
 21722 -21723  21724  1128  21727 0

c  1-1 --> 0
c    (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0 ∧ -p_1128) -> (-b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧ -b^{188, 7}_0)
c  in CNF:
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_2
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_1
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_0
c  in DIMACS:
 21722  21723 -21724  1128 -21725 0
 21722  21723 -21724  1128 -21726 0
 21722  21723 -21724  1128 -21727 0

c  0-1 --> -1
c    (-b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧ -p_1128) -> ( b^{188, 7}_2 ∧ -b^{188, 7}_1 ∧  b^{188, 7}_0)
c  in CNF:
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨  b^{188, 7}_2
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_1
c     b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨  b^{188, 7}_0
c  in DIMACS:
 21722  21723  21724  1128  21725 0
 21722  21723  21724  1128 -21726 0
 21722  21723  21724  1128  21727 0

c  -1-1 --> -2
c    ( b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧  b^{188, 6}_0 ∧ -p_1128) -> ( b^{188, 7}_2 ∧  b^{188, 7}_1 ∧ -b^{188, 7}_0)
c  in CNF:
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨  b^{188, 7}_2
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨  b^{188, 7}_1
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨  p_1128 ∨ -b^{188, 7}_0
c  in DIMACS:
-21722  21723 -21724  1128  21725 0
-21722  21723 -21724  1128  21726 0
-21722  21723 -21724  1128 -21727 0

c  -2-1 --> break 
c    ( b^{188, 6}_2 ∧  b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨  b^{188, 6}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-21722 -21723  21724  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{188, 6}_2 ∧ -b^{188, 6}_1 ∧ -b^{188, 6}_0 ∧ true) 
c  in CNF:
c    -b^{188, 6}_2 ∨  b^{188, 6}_1 ∨  b^{188, 6}_0 ∨ false 
c  in DIMACS:
-21722  21723  21724  0

c  3 does not represent an automaton state.
c    -(-b^{188, 6}_2 ∧  b^{188, 6}_1 ∧  b^{188, 6}_0 ∧ true) 
c  in CNF:
c     b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ false 
c  in DIMACS:
 21722 -21723 -21724  0
c  -3 does not represent an automaton state.
c    -( b^{188, 6}_2 ∧  b^{188, 6}_1 ∧  b^{188, 6}_0 ∧ true) 
c  in CNF:
c    -b^{188, 6}_2 ∨ -b^{188, 6}_1 ∨ -b^{188, 6}_0 ∨ false 
c  in DIMACS:
-21722 -21723 -21724  0

c INIT for k = 189
c    -b^{189, 1}_2
c    -b^{189, 1}_1
c    -b^{189, 1}_0
c  in DIMACS:
-21728 0
-21729 0
-21730 0

c Transitions for k = 189
c i = 1
c  -2+1 --> -1
c    ( b^{189, 1}_2 ∧  b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧  p_189) -> ( b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0)
c  in CNF:
c    -b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨  b^{189, 2}_2
c    -b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_1
c    -b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨  b^{189, 2}_0
c  in DIMACS:
-21728 -21729  21730 -189  21731 0
-21728 -21729  21730 -189 -21732 0
-21728 -21729  21730 -189  21733 0

c  -1+1 --> 0
c    ( b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧  b^{189, 1}_0 ∧  p_189) -> (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧ -b^{189, 2}_0)
c  in CNF:
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_2
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_1
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_0
c  in DIMACS:
-21728  21729 -21730 -189 -21731 0
-21728  21729 -21730 -189 -21732 0
-21728  21729 -21730 -189 -21733 0

c  0+1 --> 1
c    (-b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧  p_189) -> (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0)
c  in CNF:
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_2
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_1
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨  b^{189, 2}_0
c  in DIMACS:
 21728  21729  21730 -189 -21731 0
 21728  21729  21730 -189 -21732 0
 21728  21729  21730 -189  21733 0

c  1+1 --> 2
c    (-b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧  b^{189, 1}_0 ∧  p_189) -> (-b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0)
c  in CNF:
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_2
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨  b^{189, 2}_1
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ -p_189 ∨ -b^{189, 2}_0
c  in DIMACS:
 21728  21729 -21730 -189 -21731 0
 21728  21729 -21730 -189  21732 0
 21728  21729 -21730 -189 -21733 0

c  2+1 --> break 
c    (-b^{189, 1}_2 ∧  b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧  p_189) -> break
c  in CNF:
c     b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ -p_189 ∨ break
c  in DIMACS:
 21728 -21729  21730 -189 1162 0


c  2-1 --> 1
c    (-b^{189, 1}_2 ∧  b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧ -p_189) -> (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0)
c  in CNF:
c     b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_2
c     b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_1
c     b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨  b^{189, 2}_0
c  in DIMACS:
 21728 -21729  21730  189 -21731 0
 21728 -21729  21730  189 -21732 0
 21728 -21729  21730  189  21733 0

c  1-1 --> 0
c    (-b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧  b^{189, 1}_0 ∧ -p_189) -> (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧ -b^{189, 2}_0)
c  in CNF:
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_2
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_1
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_0
c  in DIMACS:
 21728  21729 -21730  189 -21731 0
 21728  21729 -21730  189 -21732 0
 21728  21729 -21730  189 -21733 0

c  0-1 --> -1
c    (-b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧ -p_189) -> ( b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0)
c  in CNF:
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨  b^{189, 2}_2
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_1
c     b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨  b^{189, 2}_0
c  in DIMACS:
 21728  21729  21730  189  21731 0
 21728  21729  21730  189 -21732 0
 21728  21729  21730  189  21733 0

c  -1-1 --> -2
c    ( b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧  b^{189, 1}_0 ∧ -p_189) -> ( b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0)
c  in CNF:
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨  b^{189, 2}_2
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨  b^{189, 2}_1
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨  p_189 ∨ -b^{189, 2}_0
c  in DIMACS:
-21728  21729 -21730  189  21731 0
-21728  21729 -21730  189  21732 0
-21728  21729 -21730  189 -21733 0

c  -2-1 --> break 
c    ( b^{189, 1}_2 ∧  b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧ -p_189) -> break
c  in CNF:
c    -b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨  b^{189, 1}_0 ∨  p_189 ∨ break
c  in DIMACS:
-21728 -21729  21730  189 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 1}_2 ∧ -b^{189, 1}_1 ∧ -b^{189, 1}_0 ∧ true) 
c  in CNF:
c    -b^{189, 1}_2 ∨  b^{189, 1}_1 ∨  b^{189, 1}_0 ∨ false 
c  in DIMACS:
-21728  21729  21730  0

c  3 does not represent an automaton state.
c    -(-b^{189, 1}_2 ∧  b^{189, 1}_1 ∧  b^{189, 1}_0 ∧ true) 
c  in CNF:
c     b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ false 
c  in DIMACS:
 21728 -21729 -21730  0
c  -3 does not represent an automaton state.
c    -( b^{189, 1}_2 ∧  b^{189, 1}_1 ∧  b^{189, 1}_0 ∧ true) 
c  in CNF:
c    -b^{189, 1}_2 ∨ -b^{189, 1}_1 ∨ -b^{189, 1}_0 ∨ false 
c  in DIMACS:
-21728 -21729 -21730  0

c i = 2
c  -2+1 --> -1
c    ( b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧  p_378) -> ( b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0)
c  in CNF:
c    -b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨  b^{189, 3}_2
c    -b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_1
c    -b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨  b^{189, 3}_0
c  in DIMACS:
-21731 -21732  21733 -378  21734 0
-21731 -21732  21733 -378 -21735 0
-21731 -21732  21733 -378  21736 0

c  -1+1 --> 0
c    ( b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0 ∧  p_378) -> (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧ -b^{189, 3}_0)
c  in CNF:
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_2
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_1
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_0
c  in DIMACS:
-21731  21732 -21733 -378 -21734 0
-21731  21732 -21733 -378 -21735 0
-21731  21732 -21733 -378 -21736 0

c  0+1 --> 1
c    (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧  p_378) -> (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0)
c  in CNF:
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_2
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_1
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨  b^{189, 3}_0
c  in DIMACS:
 21731  21732  21733 -378 -21734 0
 21731  21732  21733 -378 -21735 0
 21731  21732  21733 -378  21736 0

c  1+1 --> 2
c    (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0 ∧  p_378) -> (-b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0)
c  in CNF:
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_2
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨  b^{189, 3}_1
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ -p_378 ∨ -b^{189, 3}_0
c  in DIMACS:
 21731  21732 -21733 -378 -21734 0
 21731  21732 -21733 -378  21735 0
 21731  21732 -21733 -378 -21736 0

c  2+1 --> break 
c    (-b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧  p_378) -> break
c  in CNF:
c     b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 21731 -21732  21733 -378 1162 0


c  2-1 --> 1
c    (-b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧ -p_378) -> (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0)
c  in CNF:
c     b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_2
c     b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_1
c     b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨  b^{189, 3}_0
c  in DIMACS:
 21731 -21732  21733  378 -21734 0
 21731 -21732  21733  378 -21735 0
 21731 -21732  21733  378  21736 0

c  1-1 --> 0
c    (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0 ∧ -p_378) -> (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧ -b^{189, 3}_0)
c  in CNF:
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_2
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_1
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_0
c  in DIMACS:
 21731  21732 -21733  378 -21734 0
 21731  21732 -21733  378 -21735 0
 21731  21732 -21733  378 -21736 0

c  0-1 --> -1
c    (-b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧ -p_378) -> ( b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0)
c  in CNF:
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨  b^{189, 3}_2
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_1
c     b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨  b^{189, 3}_0
c  in DIMACS:
 21731  21732  21733  378  21734 0
 21731  21732  21733  378 -21735 0
 21731  21732  21733  378  21736 0

c  -1-1 --> -2
c    ( b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧  b^{189, 2}_0 ∧ -p_378) -> ( b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0)
c  in CNF:
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨  b^{189, 3}_2
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨  b^{189, 3}_1
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨  p_378 ∨ -b^{189, 3}_0
c  in DIMACS:
-21731  21732 -21733  378  21734 0
-21731  21732 -21733  378  21735 0
-21731  21732 -21733  378 -21736 0

c  -2-1 --> break 
c    ( b^{189, 2}_2 ∧  b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨  b^{189, 2}_0 ∨  p_378 ∨ break
c  in DIMACS:
-21731 -21732  21733  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 2}_2 ∧ -b^{189, 2}_1 ∧ -b^{189, 2}_0 ∧ true) 
c  in CNF:
c    -b^{189, 2}_2 ∨  b^{189, 2}_1 ∨  b^{189, 2}_0 ∨ false 
c  in DIMACS:
-21731  21732  21733  0

c  3 does not represent an automaton state.
c    -(-b^{189, 2}_2 ∧  b^{189, 2}_1 ∧  b^{189, 2}_0 ∧ true) 
c  in CNF:
c     b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ false 
c  in DIMACS:
 21731 -21732 -21733  0
c  -3 does not represent an automaton state.
c    -( b^{189, 2}_2 ∧  b^{189, 2}_1 ∧  b^{189, 2}_0 ∧ true) 
c  in CNF:
c    -b^{189, 2}_2 ∨ -b^{189, 2}_1 ∨ -b^{189, 2}_0 ∨ false 
c  in DIMACS:
-21731 -21732 -21733  0

c i = 3
c  -2+1 --> -1
c    ( b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧  p_567) -> ( b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0)
c  in CNF:
c    -b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨  b^{189, 4}_2
c    -b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_1
c    -b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨  b^{189, 4}_0
c  in DIMACS:
-21734 -21735  21736 -567  21737 0
-21734 -21735  21736 -567 -21738 0
-21734 -21735  21736 -567  21739 0

c  -1+1 --> 0
c    ( b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0 ∧  p_567) -> (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧ -b^{189, 4}_0)
c  in CNF:
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_2
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_1
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_0
c  in DIMACS:
-21734  21735 -21736 -567 -21737 0
-21734  21735 -21736 -567 -21738 0
-21734  21735 -21736 -567 -21739 0

c  0+1 --> 1
c    (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧  p_567) -> (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0)
c  in CNF:
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_2
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_1
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨  b^{189, 4}_0
c  in DIMACS:
 21734  21735  21736 -567 -21737 0
 21734  21735  21736 -567 -21738 0
 21734  21735  21736 -567  21739 0

c  1+1 --> 2
c    (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0 ∧  p_567) -> (-b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0)
c  in CNF:
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_2
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨  b^{189, 4}_1
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ -p_567 ∨ -b^{189, 4}_0
c  in DIMACS:
 21734  21735 -21736 -567 -21737 0
 21734  21735 -21736 -567  21738 0
 21734  21735 -21736 -567 -21739 0

c  2+1 --> break 
c    (-b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧  p_567) -> break
c  in CNF:
c     b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ -p_567 ∨ break
c  in DIMACS:
 21734 -21735  21736 -567 1162 0


c  2-1 --> 1
c    (-b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧ -p_567) -> (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0)
c  in CNF:
c     b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_2
c     b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_1
c     b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨  b^{189, 4}_0
c  in DIMACS:
 21734 -21735  21736  567 -21737 0
 21734 -21735  21736  567 -21738 0
 21734 -21735  21736  567  21739 0

c  1-1 --> 0
c    (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0 ∧ -p_567) -> (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧ -b^{189, 4}_0)
c  in CNF:
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_2
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_1
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_0
c  in DIMACS:
 21734  21735 -21736  567 -21737 0
 21734  21735 -21736  567 -21738 0
 21734  21735 -21736  567 -21739 0

c  0-1 --> -1
c    (-b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧ -p_567) -> ( b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0)
c  in CNF:
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨  b^{189, 4}_2
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_1
c     b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨  b^{189, 4}_0
c  in DIMACS:
 21734  21735  21736  567  21737 0
 21734  21735  21736  567 -21738 0
 21734  21735  21736  567  21739 0

c  -1-1 --> -2
c    ( b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧  b^{189, 3}_0 ∧ -p_567) -> ( b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0)
c  in CNF:
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨  b^{189, 4}_2
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨  b^{189, 4}_1
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨  p_567 ∨ -b^{189, 4}_0
c  in DIMACS:
-21734  21735 -21736  567  21737 0
-21734  21735 -21736  567  21738 0
-21734  21735 -21736  567 -21739 0

c  -2-1 --> break 
c    ( b^{189, 3}_2 ∧  b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧ -p_567) -> break
c  in CNF:
c    -b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨  b^{189, 3}_0 ∨  p_567 ∨ break
c  in DIMACS:
-21734 -21735  21736  567 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 3}_2 ∧ -b^{189, 3}_1 ∧ -b^{189, 3}_0 ∧ true) 
c  in CNF:
c    -b^{189, 3}_2 ∨  b^{189, 3}_1 ∨  b^{189, 3}_0 ∨ false 
c  in DIMACS:
-21734  21735  21736  0

c  3 does not represent an automaton state.
c    -(-b^{189, 3}_2 ∧  b^{189, 3}_1 ∧  b^{189, 3}_0 ∧ true) 
c  in CNF:
c     b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ false 
c  in DIMACS:
 21734 -21735 -21736  0
c  -3 does not represent an automaton state.
c    -( b^{189, 3}_2 ∧  b^{189, 3}_1 ∧  b^{189, 3}_0 ∧ true) 
c  in CNF:
c    -b^{189, 3}_2 ∨ -b^{189, 3}_1 ∨ -b^{189, 3}_0 ∨ false 
c  in DIMACS:
-21734 -21735 -21736  0

c i = 4
c  -2+1 --> -1
c    ( b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧  p_756) -> ( b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0)
c  in CNF:
c    -b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨  b^{189, 5}_2
c    -b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_1
c    -b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨  b^{189, 5}_0
c  in DIMACS:
-21737 -21738  21739 -756  21740 0
-21737 -21738  21739 -756 -21741 0
-21737 -21738  21739 -756  21742 0

c  -1+1 --> 0
c    ( b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0 ∧  p_756) -> (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧ -b^{189, 5}_0)
c  in CNF:
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_2
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_1
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_0
c  in DIMACS:
-21737  21738 -21739 -756 -21740 0
-21737  21738 -21739 -756 -21741 0
-21737  21738 -21739 -756 -21742 0

c  0+1 --> 1
c    (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧  p_756) -> (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0)
c  in CNF:
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_2
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_1
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨  b^{189, 5}_0
c  in DIMACS:
 21737  21738  21739 -756 -21740 0
 21737  21738  21739 -756 -21741 0
 21737  21738  21739 -756  21742 0

c  1+1 --> 2
c    (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0 ∧  p_756) -> (-b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0)
c  in CNF:
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_2
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨  b^{189, 5}_1
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ -p_756 ∨ -b^{189, 5}_0
c  in DIMACS:
 21737  21738 -21739 -756 -21740 0
 21737  21738 -21739 -756  21741 0
 21737  21738 -21739 -756 -21742 0

c  2+1 --> break 
c    (-b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧  p_756) -> break
c  in CNF:
c     b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 21737 -21738  21739 -756 1162 0


c  2-1 --> 1
c    (-b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧ -p_756) -> (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0)
c  in CNF:
c     b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_2
c     b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_1
c     b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨  b^{189, 5}_0
c  in DIMACS:
 21737 -21738  21739  756 -21740 0
 21737 -21738  21739  756 -21741 0
 21737 -21738  21739  756  21742 0

c  1-1 --> 0
c    (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0 ∧ -p_756) -> (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧ -b^{189, 5}_0)
c  in CNF:
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_2
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_1
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_0
c  in DIMACS:
 21737  21738 -21739  756 -21740 0
 21737  21738 -21739  756 -21741 0
 21737  21738 -21739  756 -21742 0

c  0-1 --> -1
c    (-b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧ -p_756) -> ( b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0)
c  in CNF:
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨  b^{189, 5}_2
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_1
c     b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨  b^{189, 5}_0
c  in DIMACS:
 21737  21738  21739  756  21740 0
 21737  21738  21739  756 -21741 0
 21737  21738  21739  756  21742 0

c  -1-1 --> -2
c    ( b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧  b^{189, 4}_0 ∧ -p_756) -> ( b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0)
c  in CNF:
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨  b^{189, 5}_2
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨  b^{189, 5}_1
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨  p_756 ∨ -b^{189, 5}_0
c  in DIMACS:
-21737  21738 -21739  756  21740 0
-21737  21738 -21739  756  21741 0
-21737  21738 -21739  756 -21742 0

c  -2-1 --> break 
c    ( b^{189, 4}_2 ∧  b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨  b^{189, 4}_0 ∨  p_756 ∨ break
c  in DIMACS:
-21737 -21738  21739  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 4}_2 ∧ -b^{189, 4}_1 ∧ -b^{189, 4}_0 ∧ true) 
c  in CNF:
c    -b^{189, 4}_2 ∨  b^{189, 4}_1 ∨  b^{189, 4}_0 ∨ false 
c  in DIMACS:
-21737  21738  21739  0

c  3 does not represent an automaton state.
c    -(-b^{189, 4}_2 ∧  b^{189, 4}_1 ∧  b^{189, 4}_0 ∧ true) 
c  in CNF:
c     b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ false 
c  in DIMACS:
 21737 -21738 -21739  0
c  -3 does not represent an automaton state.
c    -( b^{189, 4}_2 ∧  b^{189, 4}_1 ∧  b^{189, 4}_0 ∧ true) 
c  in CNF:
c    -b^{189, 4}_2 ∨ -b^{189, 4}_1 ∨ -b^{189, 4}_0 ∨ false 
c  in DIMACS:
-21737 -21738 -21739  0

c i = 5
c  -2+1 --> -1
c    ( b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧  p_945) -> ( b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0)
c  in CNF:
c    -b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨  b^{189, 6}_2
c    -b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_1
c    -b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨  b^{189, 6}_0
c  in DIMACS:
-21740 -21741  21742 -945  21743 0
-21740 -21741  21742 -945 -21744 0
-21740 -21741  21742 -945  21745 0

c  -1+1 --> 0
c    ( b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0 ∧  p_945) -> (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧ -b^{189, 6}_0)
c  in CNF:
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_2
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_1
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_0
c  in DIMACS:
-21740  21741 -21742 -945 -21743 0
-21740  21741 -21742 -945 -21744 0
-21740  21741 -21742 -945 -21745 0

c  0+1 --> 1
c    (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧  p_945) -> (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0)
c  in CNF:
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_2
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_1
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨  b^{189, 6}_0
c  in DIMACS:
 21740  21741  21742 -945 -21743 0
 21740  21741  21742 -945 -21744 0
 21740  21741  21742 -945  21745 0

c  1+1 --> 2
c    (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0 ∧  p_945) -> (-b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0)
c  in CNF:
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_2
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨  b^{189, 6}_1
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ -p_945 ∨ -b^{189, 6}_0
c  in DIMACS:
 21740  21741 -21742 -945 -21743 0
 21740  21741 -21742 -945  21744 0
 21740  21741 -21742 -945 -21745 0

c  2+1 --> break 
c    (-b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧  p_945) -> break
c  in CNF:
c     b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 21740 -21741  21742 -945 1162 0


c  2-1 --> 1
c    (-b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧ -p_945) -> (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0)
c  in CNF:
c     b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_2
c     b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_1
c     b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨  b^{189, 6}_0
c  in DIMACS:
 21740 -21741  21742  945 -21743 0
 21740 -21741  21742  945 -21744 0
 21740 -21741  21742  945  21745 0

c  1-1 --> 0
c    (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0 ∧ -p_945) -> (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧ -b^{189, 6}_0)
c  in CNF:
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_2
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_1
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_0
c  in DIMACS:
 21740  21741 -21742  945 -21743 0
 21740  21741 -21742  945 -21744 0
 21740  21741 -21742  945 -21745 0

c  0-1 --> -1
c    (-b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧ -p_945) -> ( b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0)
c  in CNF:
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨  b^{189, 6}_2
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_1
c     b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨  b^{189, 6}_0
c  in DIMACS:
 21740  21741  21742  945  21743 0
 21740  21741  21742  945 -21744 0
 21740  21741  21742  945  21745 0

c  -1-1 --> -2
c    ( b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧  b^{189, 5}_0 ∧ -p_945) -> ( b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0)
c  in CNF:
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨  b^{189, 6}_2
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨  b^{189, 6}_1
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨  p_945 ∨ -b^{189, 6}_0
c  in DIMACS:
-21740  21741 -21742  945  21743 0
-21740  21741 -21742  945  21744 0
-21740  21741 -21742  945 -21745 0

c  -2-1 --> break 
c    ( b^{189, 5}_2 ∧  b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨  b^{189, 5}_0 ∨  p_945 ∨ break
c  in DIMACS:
-21740 -21741  21742  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 5}_2 ∧ -b^{189, 5}_1 ∧ -b^{189, 5}_0 ∧ true) 
c  in CNF:
c    -b^{189, 5}_2 ∨  b^{189, 5}_1 ∨  b^{189, 5}_0 ∨ false 
c  in DIMACS:
-21740  21741  21742  0

c  3 does not represent an automaton state.
c    -(-b^{189, 5}_2 ∧  b^{189, 5}_1 ∧  b^{189, 5}_0 ∧ true) 
c  in CNF:
c     b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ false 
c  in DIMACS:
 21740 -21741 -21742  0
c  -3 does not represent an automaton state.
c    -( b^{189, 5}_2 ∧  b^{189, 5}_1 ∧  b^{189, 5}_0 ∧ true) 
c  in CNF:
c    -b^{189, 5}_2 ∨ -b^{189, 5}_1 ∨ -b^{189, 5}_0 ∨ false 
c  in DIMACS:
-21740 -21741 -21742  0

c i = 6
c  -2+1 --> -1
c    ( b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧  p_1134) -> ( b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧  b^{189, 7}_0)
c  in CNF:
c    -b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨  b^{189, 7}_2
c    -b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_1
c    -b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨  b^{189, 7}_0
c  in DIMACS:
-21743 -21744  21745 -1134  21746 0
-21743 -21744  21745 -1134 -21747 0
-21743 -21744  21745 -1134  21748 0

c  -1+1 --> 0
c    ( b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0 ∧  p_1134) -> (-b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧ -b^{189, 7}_0)
c  in CNF:
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_2
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_1
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_0
c  in DIMACS:
-21743  21744 -21745 -1134 -21746 0
-21743  21744 -21745 -1134 -21747 0
-21743  21744 -21745 -1134 -21748 0

c  0+1 --> 1
c    (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧  p_1134) -> (-b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧  b^{189, 7}_0)
c  in CNF:
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_2
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_1
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨  b^{189, 7}_0
c  in DIMACS:
 21743  21744  21745 -1134 -21746 0
 21743  21744  21745 -1134 -21747 0
 21743  21744  21745 -1134  21748 0

c  1+1 --> 2
c    (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0 ∧  p_1134) -> (-b^{189, 7}_2 ∧  b^{189, 7}_1 ∧ -b^{189, 7}_0)
c  in CNF:
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_2
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨  b^{189, 7}_1
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ -p_1134 ∨ -b^{189, 7}_0
c  in DIMACS:
 21743  21744 -21745 -1134 -21746 0
 21743  21744 -21745 -1134  21747 0
 21743  21744 -21745 -1134 -21748 0

c  2+1 --> break 
c    (-b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 21743 -21744  21745 -1134 1162 0


c  2-1 --> 1
c    (-b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧ -p_1134) -> (-b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧  b^{189, 7}_0)
c  in CNF:
c     b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_2
c     b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_1
c     b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨  b^{189, 7}_0
c  in DIMACS:
 21743 -21744  21745  1134 -21746 0
 21743 -21744  21745  1134 -21747 0
 21743 -21744  21745  1134  21748 0

c  1-1 --> 0
c    (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0 ∧ -p_1134) -> (-b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧ -b^{189, 7}_0)
c  in CNF:
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_2
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_1
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_0
c  in DIMACS:
 21743  21744 -21745  1134 -21746 0
 21743  21744 -21745  1134 -21747 0
 21743  21744 -21745  1134 -21748 0

c  0-1 --> -1
c    (-b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧ -p_1134) -> ( b^{189, 7}_2 ∧ -b^{189, 7}_1 ∧  b^{189, 7}_0)
c  in CNF:
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨  b^{189, 7}_2
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_1
c     b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨  b^{189, 7}_0
c  in DIMACS:
 21743  21744  21745  1134  21746 0
 21743  21744  21745  1134 -21747 0
 21743  21744  21745  1134  21748 0

c  -1-1 --> -2
c    ( b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧  b^{189, 6}_0 ∧ -p_1134) -> ( b^{189, 7}_2 ∧  b^{189, 7}_1 ∧ -b^{189, 7}_0)
c  in CNF:
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨  b^{189, 7}_2
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨  b^{189, 7}_1
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨  p_1134 ∨ -b^{189, 7}_0
c  in DIMACS:
-21743  21744 -21745  1134  21746 0
-21743  21744 -21745  1134  21747 0
-21743  21744 -21745  1134 -21748 0

c  -2-1 --> break 
c    ( b^{189, 6}_2 ∧  b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨  b^{189, 6}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-21743 -21744  21745  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{189, 6}_2 ∧ -b^{189, 6}_1 ∧ -b^{189, 6}_0 ∧ true) 
c  in CNF:
c    -b^{189, 6}_2 ∨  b^{189, 6}_1 ∨  b^{189, 6}_0 ∨ false 
c  in DIMACS:
-21743  21744  21745  0

c  3 does not represent an automaton state.
c    -(-b^{189, 6}_2 ∧  b^{189, 6}_1 ∧  b^{189, 6}_0 ∧ true) 
c  in CNF:
c     b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ false 
c  in DIMACS:
 21743 -21744 -21745  0
c  -3 does not represent an automaton state.
c    -( b^{189, 6}_2 ∧  b^{189, 6}_1 ∧  b^{189, 6}_0 ∧ true) 
c  in CNF:
c    -b^{189, 6}_2 ∨ -b^{189, 6}_1 ∨ -b^{189, 6}_0 ∨ false 
c  in DIMACS:
-21743 -21744 -21745  0

c INIT for k = 190
c    -b^{190, 1}_2
c    -b^{190, 1}_1
c    -b^{190, 1}_0
c  in DIMACS:
-21749 0
-21750 0
-21751 0

c Transitions for k = 190
c i = 1
c  -2+1 --> -1
c    ( b^{190, 1}_2 ∧  b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧  p_190) -> ( b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0)
c  in CNF:
c    -b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨  b^{190, 2}_2
c    -b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_1
c    -b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨  b^{190, 2}_0
c  in DIMACS:
-21749 -21750  21751 -190  21752 0
-21749 -21750  21751 -190 -21753 0
-21749 -21750  21751 -190  21754 0

c  -1+1 --> 0
c    ( b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧  b^{190, 1}_0 ∧  p_190) -> (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧ -b^{190, 2}_0)
c  in CNF:
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_2
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_1
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_0
c  in DIMACS:
-21749  21750 -21751 -190 -21752 0
-21749  21750 -21751 -190 -21753 0
-21749  21750 -21751 -190 -21754 0

c  0+1 --> 1
c    (-b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧  p_190) -> (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0)
c  in CNF:
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_2
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_1
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨  b^{190, 2}_0
c  in DIMACS:
 21749  21750  21751 -190 -21752 0
 21749  21750  21751 -190 -21753 0
 21749  21750  21751 -190  21754 0

c  1+1 --> 2
c    (-b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧  b^{190, 1}_0 ∧  p_190) -> (-b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0)
c  in CNF:
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_2
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨  b^{190, 2}_1
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ -p_190 ∨ -b^{190, 2}_0
c  in DIMACS:
 21749  21750 -21751 -190 -21752 0
 21749  21750 -21751 -190  21753 0
 21749  21750 -21751 -190 -21754 0

c  2+1 --> break 
c    (-b^{190, 1}_2 ∧  b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧  p_190) -> break
c  in CNF:
c     b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ -p_190 ∨ break
c  in DIMACS:
 21749 -21750  21751 -190 1162 0


c  2-1 --> 1
c    (-b^{190, 1}_2 ∧  b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧ -p_190) -> (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0)
c  in CNF:
c     b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_2
c     b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_1
c     b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨  b^{190, 2}_0
c  in DIMACS:
 21749 -21750  21751  190 -21752 0
 21749 -21750  21751  190 -21753 0
 21749 -21750  21751  190  21754 0

c  1-1 --> 0
c    (-b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧  b^{190, 1}_0 ∧ -p_190) -> (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧ -b^{190, 2}_0)
c  in CNF:
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_2
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_1
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_0
c  in DIMACS:
 21749  21750 -21751  190 -21752 0
 21749  21750 -21751  190 -21753 0
 21749  21750 -21751  190 -21754 0

c  0-1 --> -1
c    (-b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧ -p_190) -> ( b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0)
c  in CNF:
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨  b^{190, 2}_2
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_1
c     b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨  b^{190, 2}_0
c  in DIMACS:
 21749  21750  21751  190  21752 0
 21749  21750  21751  190 -21753 0
 21749  21750  21751  190  21754 0

c  -1-1 --> -2
c    ( b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧  b^{190, 1}_0 ∧ -p_190) -> ( b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0)
c  in CNF:
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨  b^{190, 2}_2
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨  b^{190, 2}_1
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨  p_190 ∨ -b^{190, 2}_0
c  in DIMACS:
-21749  21750 -21751  190  21752 0
-21749  21750 -21751  190  21753 0
-21749  21750 -21751  190 -21754 0

c  -2-1 --> break 
c    ( b^{190, 1}_2 ∧  b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧ -p_190) -> break
c  in CNF:
c    -b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨  b^{190, 1}_0 ∨  p_190 ∨ break
c  in DIMACS:
-21749 -21750  21751  190 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 1}_2 ∧ -b^{190, 1}_1 ∧ -b^{190, 1}_0 ∧ true) 
c  in CNF:
c    -b^{190, 1}_2 ∨  b^{190, 1}_1 ∨  b^{190, 1}_0 ∨ false 
c  in DIMACS:
-21749  21750  21751  0

c  3 does not represent an automaton state.
c    -(-b^{190, 1}_2 ∧  b^{190, 1}_1 ∧  b^{190, 1}_0 ∧ true) 
c  in CNF:
c     b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ false 
c  in DIMACS:
 21749 -21750 -21751  0
c  -3 does not represent an automaton state.
c    -( b^{190, 1}_2 ∧  b^{190, 1}_1 ∧  b^{190, 1}_0 ∧ true) 
c  in CNF:
c    -b^{190, 1}_2 ∨ -b^{190, 1}_1 ∨ -b^{190, 1}_0 ∨ false 
c  in DIMACS:
-21749 -21750 -21751  0

c i = 2
c  -2+1 --> -1
c    ( b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧  p_380) -> ( b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0)
c  in CNF:
c    -b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨  b^{190, 3}_2
c    -b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_1
c    -b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨  b^{190, 3}_0
c  in DIMACS:
-21752 -21753  21754 -380  21755 0
-21752 -21753  21754 -380 -21756 0
-21752 -21753  21754 -380  21757 0

c  -1+1 --> 0
c    ( b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0 ∧  p_380) -> (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧ -b^{190, 3}_0)
c  in CNF:
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_2
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_1
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_0
c  in DIMACS:
-21752  21753 -21754 -380 -21755 0
-21752  21753 -21754 -380 -21756 0
-21752  21753 -21754 -380 -21757 0

c  0+1 --> 1
c    (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧  p_380) -> (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0)
c  in CNF:
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_2
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_1
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨  b^{190, 3}_0
c  in DIMACS:
 21752  21753  21754 -380 -21755 0
 21752  21753  21754 -380 -21756 0
 21752  21753  21754 -380  21757 0

c  1+1 --> 2
c    (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0 ∧  p_380) -> (-b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0)
c  in CNF:
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_2
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨  b^{190, 3}_1
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ -p_380 ∨ -b^{190, 3}_0
c  in DIMACS:
 21752  21753 -21754 -380 -21755 0
 21752  21753 -21754 -380  21756 0
 21752  21753 -21754 -380 -21757 0

c  2+1 --> break 
c    (-b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧  p_380) -> break
c  in CNF:
c     b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 21752 -21753  21754 -380 1162 0


c  2-1 --> 1
c    (-b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧ -p_380) -> (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0)
c  in CNF:
c     b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_2
c     b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_1
c     b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨  b^{190, 3}_0
c  in DIMACS:
 21752 -21753  21754  380 -21755 0
 21752 -21753  21754  380 -21756 0
 21752 -21753  21754  380  21757 0

c  1-1 --> 0
c    (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0 ∧ -p_380) -> (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧ -b^{190, 3}_0)
c  in CNF:
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_2
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_1
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_0
c  in DIMACS:
 21752  21753 -21754  380 -21755 0
 21752  21753 -21754  380 -21756 0
 21752  21753 -21754  380 -21757 0

c  0-1 --> -1
c    (-b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧ -p_380) -> ( b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0)
c  in CNF:
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨  b^{190, 3}_2
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_1
c     b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨  b^{190, 3}_0
c  in DIMACS:
 21752  21753  21754  380  21755 0
 21752  21753  21754  380 -21756 0
 21752  21753  21754  380  21757 0

c  -1-1 --> -2
c    ( b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧  b^{190, 2}_0 ∧ -p_380) -> ( b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0)
c  in CNF:
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨  b^{190, 3}_2
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨  b^{190, 3}_1
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨  p_380 ∨ -b^{190, 3}_0
c  in DIMACS:
-21752  21753 -21754  380  21755 0
-21752  21753 -21754  380  21756 0
-21752  21753 -21754  380 -21757 0

c  -2-1 --> break 
c    ( b^{190, 2}_2 ∧  b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨  b^{190, 2}_0 ∨  p_380 ∨ break
c  in DIMACS:
-21752 -21753  21754  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 2}_2 ∧ -b^{190, 2}_1 ∧ -b^{190, 2}_0 ∧ true) 
c  in CNF:
c    -b^{190, 2}_2 ∨  b^{190, 2}_1 ∨  b^{190, 2}_0 ∨ false 
c  in DIMACS:
-21752  21753  21754  0

c  3 does not represent an automaton state.
c    -(-b^{190, 2}_2 ∧  b^{190, 2}_1 ∧  b^{190, 2}_0 ∧ true) 
c  in CNF:
c     b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ false 
c  in DIMACS:
 21752 -21753 -21754  0
c  -3 does not represent an automaton state.
c    -( b^{190, 2}_2 ∧  b^{190, 2}_1 ∧  b^{190, 2}_0 ∧ true) 
c  in CNF:
c    -b^{190, 2}_2 ∨ -b^{190, 2}_1 ∨ -b^{190, 2}_0 ∨ false 
c  in DIMACS:
-21752 -21753 -21754  0

c i = 3
c  -2+1 --> -1
c    ( b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧  p_570) -> ( b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0)
c  in CNF:
c    -b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨  b^{190, 4}_2
c    -b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_1
c    -b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨  b^{190, 4}_0
c  in DIMACS:
-21755 -21756  21757 -570  21758 0
-21755 -21756  21757 -570 -21759 0
-21755 -21756  21757 -570  21760 0

c  -1+1 --> 0
c    ( b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0 ∧  p_570) -> (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧ -b^{190, 4}_0)
c  in CNF:
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_2
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_1
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_0
c  in DIMACS:
-21755  21756 -21757 -570 -21758 0
-21755  21756 -21757 -570 -21759 0
-21755  21756 -21757 -570 -21760 0

c  0+1 --> 1
c    (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧  p_570) -> (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0)
c  in CNF:
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_2
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_1
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨  b^{190, 4}_0
c  in DIMACS:
 21755  21756  21757 -570 -21758 0
 21755  21756  21757 -570 -21759 0
 21755  21756  21757 -570  21760 0

c  1+1 --> 2
c    (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0 ∧  p_570) -> (-b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0)
c  in CNF:
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_2
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨  b^{190, 4}_1
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ -p_570 ∨ -b^{190, 4}_0
c  in DIMACS:
 21755  21756 -21757 -570 -21758 0
 21755  21756 -21757 -570  21759 0
 21755  21756 -21757 -570 -21760 0

c  2+1 --> break 
c    (-b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧  p_570) -> break
c  in CNF:
c     b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 21755 -21756  21757 -570 1162 0


c  2-1 --> 1
c    (-b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧ -p_570) -> (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0)
c  in CNF:
c     b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_2
c     b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_1
c     b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨  b^{190, 4}_0
c  in DIMACS:
 21755 -21756  21757  570 -21758 0
 21755 -21756  21757  570 -21759 0
 21755 -21756  21757  570  21760 0

c  1-1 --> 0
c    (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0 ∧ -p_570) -> (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧ -b^{190, 4}_0)
c  in CNF:
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_2
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_1
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_0
c  in DIMACS:
 21755  21756 -21757  570 -21758 0
 21755  21756 -21757  570 -21759 0
 21755  21756 -21757  570 -21760 0

c  0-1 --> -1
c    (-b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧ -p_570) -> ( b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0)
c  in CNF:
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨  b^{190, 4}_2
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_1
c     b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨  b^{190, 4}_0
c  in DIMACS:
 21755  21756  21757  570  21758 0
 21755  21756  21757  570 -21759 0
 21755  21756  21757  570  21760 0

c  -1-1 --> -2
c    ( b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧  b^{190, 3}_0 ∧ -p_570) -> ( b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0)
c  in CNF:
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨  b^{190, 4}_2
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨  b^{190, 4}_1
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨  p_570 ∨ -b^{190, 4}_0
c  in DIMACS:
-21755  21756 -21757  570  21758 0
-21755  21756 -21757  570  21759 0
-21755  21756 -21757  570 -21760 0

c  -2-1 --> break 
c    ( b^{190, 3}_2 ∧  b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨  b^{190, 3}_0 ∨  p_570 ∨ break
c  in DIMACS:
-21755 -21756  21757  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 3}_2 ∧ -b^{190, 3}_1 ∧ -b^{190, 3}_0 ∧ true) 
c  in CNF:
c    -b^{190, 3}_2 ∨  b^{190, 3}_1 ∨  b^{190, 3}_0 ∨ false 
c  in DIMACS:
-21755  21756  21757  0

c  3 does not represent an automaton state.
c    -(-b^{190, 3}_2 ∧  b^{190, 3}_1 ∧  b^{190, 3}_0 ∧ true) 
c  in CNF:
c     b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ false 
c  in DIMACS:
 21755 -21756 -21757  0
c  -3 does not represent an automaton state.
c    -( b^{190, 3}_2 ∧  b^{190, 3}_1 ∧  b^{190, 3}_0 ∧ true) 
c  in CNF:
c    -b^{190, 3}_2 ∨ -b^{190, 3}_1 ∨ -b^{190, 3}_0 ∨ false 
c  in DIMACS:
-21755 -21756 -21757  0

c i = 4
c  -2+1 --> -1
c    ( b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧  p_760) -> ( b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0)
c  in CNF:
c    -b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨  b^{190, 5}_2
c    -b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_1
c    -b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨  b^{190, 5}_0
c  in DIMACS:
-21758 -21759  21760 -760  21761 0
-21758 -21759  21760 -760 -21762 0
-21758 -21759  21760 -760  21763 0

c  -1+1 --> 0
c    ( b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0 ∧  p_760) -> (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧ -b^{190, 5}_0)
c  in CNF:
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_2
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_1
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_0
c  in DIMACS:
-21758  21759 -21760 -760 -21761 0
-21758  21759 -21760 -760 -21762 0
-21758  21759 -21760 -760 -21763 0

c  0+1 --> 1
c    (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧  p_760) -> (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0)
c  in CNF:
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_2
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_1
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨  b^{190, 5}_0
c  in DIMACS:
 21758  21759  21760 -760 -21761 0
 21758  21759  21760 -760 -21762 0
 21758  21759  21760 -760  21763 0

c  1+1 --> 2
c    (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0 ∧  p_760) -> (-b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0)
c  in CNF:
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_2
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨  b^{190, 5}_1
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ -p_760 ∨ -b^{190, 5}_0
c  in DIMACS:
 21758  21759 -21760 -760 -21761 0
 21758  21759 -21760 -760  21762 0
 21758  21759 -21760 -760 -21763 0

c  2+1 --> break 
c    (-b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧  p_760) -> break
c  in CNF:
c     b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 21758 -21759  21760 -760 1162 0


c  2-1 --> 1
c    (-b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧ -p_760) -> (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0)
c  in CNF:
c     b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_2
c     b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_1
c     b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨  b^{190, 5}_0
c  in DIMACS:
 21758 -21759  21760  760 -21761 0
 21758 -21759  21760  760 -21762 0
 21758 -21759  21760  760  21763 0

c  1-1 --> 0
c    (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0 ∧ -p_760) -> (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧ -b^{190, 5}_0)
c  in CNF:
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_2
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_1
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_0
c  in DIMACS:
 21758  21759 -21760  760 -21761 0
 21758  21759 -21760  760 -21762 0
 21758  21759 -21760  760 -21763 0

c  0-1 --> -1
c    (-b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧ -p_760) -> ( b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0)
c  in CNF:
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨  b^{190, 5}_2
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_1
c     b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨  b^{190, 5}_0
c  in DIMACS:
 21758  21759  21760  760  21761 0
 21758  21759  21760  760 -21762 0
 21758  21759  21760  760  21763 0

c  -1-1 --> -2
c    ( b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧  b^{190, 4}_0 ∧ -p_760) -> ( b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0)
c  in CNF:
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨  b^{190, 5}_2
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨  b^{190, 5}_1
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨  p_760 ∨ -b^{190, 5}_0
c  in DIMACS:
-21758  21759 -21760  760  21761 0
-21758  21759 -21760  760  21762 0
-21758  21759 -21760  760 -21763 0

c  -2-1 --> break 
c    ( b^{190, 4}_2 ∧  b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨  b^{190, 4}_0 ∨  p_760 ∨ break
c  in DIMACS:
-21758 -21759  21760  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 4}_2 ∧ -b^{190, 4}_1 ∧ -b^{190, 4}_0 ∧ true) 
c  in CNF:
c    -b^{190, 4}_2 ∨  b^{190, 4}_1 ∨  b^{190, 4}_0 ∨ false 
c  in DIMACS:
-21758  21759  21760  0

c  3 does not represent an automaton state.
c    -(-b^{190, 4}_2 ∧  b^{190, 4}_1 ∧  b^{190, 4}_0 ∧ true) 
c  in CNF:
c     b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ false 
c  in DIMACS:
 21758 -21759 -21760  0
c  -3 does not represent an automaton state.
c    -( b^{190, 4}_2 ∧  b^{190, 4}_1 ∧  b^{190, 4}_0 ∧ true) 
c  in CNF:
c    -b^{190, 4}_2 ∨ -b^{190, 4}_1 ∨ -b^{190, 4}_0 ∨ false 
c  in DIMACS:
-21758 -21759 -21760  0

c i = 5
c  -2+1 --> -1
c    ( b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧  p_950) -> ( b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0)
c  in CNF:
c    -b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨  b^{190, 6}_2
c    -b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_1
c    -b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨  b^{190, 6}_0
c  in DIMACS:
-21761 -21762  21763 -950  21764 0
-21761 -21762  21763 -950 -21765 0
-21761 -21762  21763 -950  21766 0

c  -1+1 --> 0
c    ( b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0 ∧  p_950) -> (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧ -b^{190, 6}_0)
c  in CNF:
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_2
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_1
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_0
c  in DIMACS:
-21761  21762 -21763 -950 -21764 0
-21761  21762 -21763 -950 -21765 0
-21761  21762 -21763 -950 -21766 0

c  0+1 --> 1
c    (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧  p_950) -> (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0)
c  in CNF:
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_2
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_1
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨  b^{190, 6}_0
c  in DIMACS:
 21761  21762  21763 -950 -21764 0
 21761  21762  21763 -950 -21765 0
 21761  21762  21763 -950  21766 0

c  1+1 --> 2
c    (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0 ∧  p_950) -> (-b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0)
c  in CNF:
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_2
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨  b^{190, 6}_1
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ -p_950 ∨ -b^{190, 6}_0
c  in DIMACS:
 21761  21762 -21763 -950 -21764 0
 21761  21762 -21763 -950  21765 0
 21761  21762 -21763 -950 -21766 0

c  2+1 --> break 
c    (-b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧  p_950) -> break
c  in CNF:
c     b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ -p_950 ∨ break
c  in DIMACS:
 21761 -21762  21763 -950 1162 0


c  2-1 --> 1
c    (-b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧ -p_950) -> (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0)
c  in CNF:
c     b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_2
c     b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_1
c     b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨  b^{190, 6}_0
c  in DIMACS:
 21761 -21762  21763  950 -21764 0
 21761 -21762  21763  950 -21765 0
 21761 -21762  21763  950  21766 0

c  1-1 --> 0
c    (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0 ∧ -p_950) -> (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧ -b^{190, 6}_0)
c  in CNF:
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_2
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_1
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_0
c  in DIMACS:
 21761  21762 -21763  950 -21764 0
 21761  21762 -21763  950 -21765 0
 21761  21762 -21763  950 -21766 0

c  0-1 --> -1
c    (-b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧ -p_950) -> ( b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0)
c  in CNF:
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨  b^{190, 6}_2
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_1
c     b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨  b^{190, 6}_0
c  in DIMACS:
 21761  21762  21763  950  21764 0
 21761  21762  21763  950 -21765 0
 21761  21762  21763  950  21766 0

c  -1-1 --> -2
c    ( b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧  b^{190, 5}_0 ∧ -p_950) -> ( b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0)
c  in CNF:
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨  b^{190, 6}_2
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨  b^{190, 6}_1
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨  p_950 ∨ -b^{190, 6}_0
c  in DIMACS:
-21761  21762 -21763  950  21764 0
-21761  21762 -21763  950  21765 0
-21761  21762 -21763  950 -21766 0

c  -2-1 --> break 
c    ( b^{190, 5}_2 ∧  b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧ -p_950) -> break
c  in CNF:
c    -b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨  b^{190, 5}_0 ∨  p_950 ∨ break
c  in DIMACS:
-21761 -21762  21763  950 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 5}_2 ∧ -b^{190, 5}_1 ∧ -b^{190, 5}_0 ∧ true) 
c  in CNF:
c    -b^{190, 5}_2 ∨  b^{190, 5}_1 ∨  b^{190, 5}_0 ∨ false 
c  in DIMACS:
-21761  21762  21763  0

c  3 does not represent an automaton state.
c    -(-b^{190, 5}_2 ∧  b^{190, 5}_1 ∧  b^{190, 5}_0 ∧ true) 
c  in CNF:
c     b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ false 
c  in DIMACS:
 21761 -21762 -21763  0
c  -3 does not represent an automaton state.
c    -( b^{190, 5}_2 ∧  b^{190, 5}_1 ∧  b^{190, 5}_0 ∧ true) 
c  in CNF:
c    -b^{190, 5}_2 ∨ -b^{190, 5}_1 ∨ -b^{190, 5}_0 ∨ false 
c  in DIMACS:
-21761 -21762 -21763  0

c i = 6
c  -2+1 --> -1
c    ( b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧  p_1140) -> ( b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧  b^{190, 7}_0)
c  in CNF:
c    -b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨  b^{190, 7}_2
c    -b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_1
c    -b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨  b^{190, 7}_0
c  in DIMACS:
-21764 -21765  21766 -1140  21767 0
-21764 -21765  21766 -1140 -21768 0
-21764 -21765  21766 -1140  21769 0

c  -1+1 --> 0
c    ( b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0 ∧  p_1140) -> (-b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧ -b^{190, 7}_0)
c  in CNF:
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_2
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_1
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_0
c  in DIMACS:
-21764  21765 -21766 -1140 -21767 0
-21764  21765 -21766 -1140 -21768 0
-21764  21765 -21766 -1140 -21769 0

c  0+1 --> 1
c    (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧  p_1140) -> (-b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧  b^{190, 7}_0)
c  in CNF:
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_2
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_1
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨  b^{190, 7}_0
c  in DIMACS:
 21764  21765  21766 -1140 -21767 0
 21764  21765  21766 -1140 -21768 0
 21764  21765  21766 -1140  21769 0

c  1+1 --> 2
c    (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0 ∧  p_1140) -> (-b^{190, 7}_2 ∧  b^{190, 7}_1 ∧ -b^{190, 7}_0)
c  in CNF:
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_2
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨  b^{190, 7}_1
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ -p_1140 ∨ -b^{190, 7}_0
c  in DIMACS:
 21764  21765 -21766 -1140 -21767 0
 21764  21765 -21766 -1140  21768 0
 21764  21765 -21766 -1140 -21769 0

c  2+1 --> break 
c    (-b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 21764 -21765  21766 -1140 1162 0


c  2-1 --> 1
c    (-b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧ -p_1140) -> (-b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧  b^{190, 7}_0)
c  in CNF:
c     b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_2
c     b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_1
c     b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨  b^{190, 7}_0
c  in DIMACS:
 21764 -21765  21766  1140 -21767 0
 21764 -21765  21766  1140 -21768 0
 21764 -21765  21766  1140  21769 0

c  1-1 --> 0
c    (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0 ∧ -p_1140) -> (-b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧ -b^{190, 7}_0)
c  in CNF:
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_2
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_1
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_0
c  in DIMACS:
 21764  21765 -21766  1140 -21767 0
 21764  21765 -21766  1140 -21768 0
 21764  21765 -21766  1140 -21769 0

c  0-1 --> -1
c    (-b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧ -p_1140) -> ( b^{190, 7}_2 ∧ -b^{190, 7}_1 ∧  b^{190, 7}_0)
c  in CNF:
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨  b^{190, 7}_2
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_1
c     b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨  b^{190, 7}_0
c  in DIMACS:
 21764  21765  21766  1140  21767 0
 21764  21765  21766  1140 -21768 0
 21764  21765  21766  1140  21769 0

c  -1-1 --> -2
c    ( b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧  b^{190, 6}_0 ∧ -p_1140) -> ( b^{190, 7}_2 ∧  b^{190, 7}_1 ∧ -b^{190, 7}_0)
c  in CNF:
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨  b^{190, 7}_2
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨  b^{190, 7}_1
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨  p_1140 ∨ -b^{190, 7}_0
c  in DIMACS:
-21764  21765 -21766  1140  21767 0
-21764  21765 -21766  1140  21768 0
-21764  21765 -21766  1140 -21769 0

c  -2-1 --> break 
c    ( b^{190, 6}_2 ∧  b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨  b^{190, 6}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-21764 -21765  21766  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{190, 6}_2 ∧ -b^{190, 6}_1 ∧ -b^{190, 6}_0 ∧ true) 
c  in CNF:
c    -b^{190, 6}_2 ∨  b^{190, 6}_1 ∨  b^{190, 6}_0 ∨ false 
c  in DIMACS:
-21764  21765  21766  0

c  3 does not represent an automaton state.
c    -(-b^{190, 6}_2 ∧  b^{190, 6}_1 ∧  b^{190, 6}_0 ∧ true) 
c  in CNF:
c     b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ false 
c  in DIMACS:
 21764 -21765 -21766  0
c  -3 does not represent an automaton state.
c    -( b^{190, 6}_2 ∧  b^{190, 6}_1 ∧  b^{190, 6}_0 ∧ true) 
c  in CNF:
c    -b^{190, 6}_2 ∨ -b^{190, 6}_1 ∨ -b^{190, 6}_0 ∨ false 
c  in DIMACS:
-21764 -21765 -21766  0

c INIT for k = 191
c    -b^{191, 1}_2
c    -b^{191, 1}_1
c    -b^{191, 1}_0
c  in DIMACS:
-21770 0
-21771 0
-21772 0

c Transitions for k = 191
c i = 1
c  -2+1 --> -1
c    ( b^{191, 1}_2 ∧  b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧  p_191) -> ( b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0)
c  in CNF:
c    -b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨  b^{191, 2}_2
c    -b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_1
c    -b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨  b^{191, 2}_0
c  in DIMACS:
-21770 -21771  21772 -191  21773 0
-21770 -21771  21772 -191 -21774 0
-21770 -21771  21772 -191  21775 0

c  -1+1 --> 0
c    ( b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧  b^{191, 1}_0 ∧  p_191) -> (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧ -b^{191, 2}_0)
c  in CNF:
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_2
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_1
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_0
c  in DIMACS:
-21770  21771 -21772 -191 -21773 0
-21770  21771 -21772 -191 -21774 0
-21770  21771 -21772 -191 -21775 0

c  0+1 --> 1
c    (-b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧  p_191) -> (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0)
c  in CNF:
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_2
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_1
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨  b^{191, 2}_0
c  in DIMACS:
 21770  21771  21772 -191 -21773 0
 21770  21771  21772 -191 -21774 0
 21770  21771  21772 -191  21775 0

c  1+1 --> 2
c    (-b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧  b^{191, 1}_0 ∧  p_191) -> (-b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0)
c  in CNF:
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_2
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨  b^{191, 2}_1
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ -p_191 ∨ -b^{191, 2}_0
c  in DIMACS:
 21770  21771 -21772 -191 -21773 0
 21770  21771 -21772 -191  21774 0
 21770  21771 -21772 -191 -21775 0

c  2+1 --> break 
c    (-b^{191, 1}_2 ∧  b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧  p_191) -> break
c  in CNF:
c     b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ -p_191 ∨ break
c  in DIMACS:
 21770 -21771  21772 -191 1162 0


c  2-1 --> 1
c    (-b^{191, 1}_2 ∧  b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧ -p_191) -> (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0)
c  in CNF:
c     b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_2
c     b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_1
c     b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨  b^{191, 2}_0
c  in DIMACS:
 21770 -21771  21772  191 -21773 0
 21770 -21771  21772  191 -21774 0
 21770 -21771  21772  191  21775 0

c  1-1 --> 0
c    (-b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧  b^{191, 1}_0 ∧ -p_191) -> (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧ -b^{191, 2}_0)
c  in CNF:
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_2
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_1
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_0
c  in DIMACS:
 21770  21771 -21772  191 -21773 0
 21770  21771 -21772  191 -21774 0
 21770  21771 -21772  191 -21775 0

c  0-1 --> -1
c    (-b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧ -p_191) -> ( b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0)
c  in CNF:
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨  b^{191, 2}_2
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_1
c     b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨  b^{191, 2}_0
c  in DIMACS:
 21770  21771  21772  191  21773 0
 21770  21771  21772  191 -21774 0
 21770  21771  21772  191  21775 0

c  -1-1 --> -2
c    ( b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧  b^{191, 1}_0 ∧ -p_191) -> ( b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0)
c  in CNF:
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨  b^{191, 2}_2
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨  b^{191, 2}_1
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨  p_191 ∨ -b^{191, 2}_0
c  in DIMACS:
-21770  21771 -21772  191  21773 0
-21770  21771 -21772  191  21774 0
-21770  21771 -21772  191 -21775 0

c  -2-1 --> break 
c    ( b^{191, 1}_2 ∧  b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧ -p_191) -> break
c  in CNF:
c    -b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨  b^{191, 1}_0 ∨  p_191 ∨ break
c  in DIMACS:
-21770 -21771  21772  191 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 1}_2 ∧ -b^{191, 1}_1 ∧ -b^{191, 1}_0 ∧ true) 
c  in CNF:
c    -b^{191, 1}_2 ∨  b^{191, 1}_1 ∨  b^{191, 1}_0 ∨ false 
c  in DIMACS:
-21770  21771  21772  0

c  3 does not represent an automaton state.
c    -(-b^{191, 1}_2 ∧  b^{191, 1}_1 ∧  b^{191, 1}_0 ∧ true) 
c  in CNF:
c     b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ false 
c  in DIMACS:
 21770 -21771 -21772  0
c  -3 does not represent an automaton state.
c    -( b^{191, 1}_2 ∧  b^{191, 1}_1 ∧  b^{191, 1}_0 ∧ true) 
c  in CNF:
c    -b^{191, 1}_2 ∨ -b^{191, 1}_1 ∨ -b^{191, 1}_0 ∨ false 
c  in DIMACS:
-21770 -21771 -21772  0

c i = 2
c  -2+1 --> -1
c    ( b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧  p_382) -> ( b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0)
c  in CNF:
c    -b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨  b^{191, 3}_2
c    -b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_1
c    -b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨  b^{191, 3}_0
c  in DIMACS:
-21773 -21774  21775 -382  21776 0
-21773 -21774  21775 -382 -21777 0
-21773 -21774  21775 -382  21778 0

c  -1+1 --> 0
c    ( b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0 ∧  p_382) -> (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧ -b^{191, 3}_0)
c  in CNF:
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_2
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_1
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_0
c  in DIMACS:
-21773  21774 -21775 -382 -21776 0
-21773  21774 -21775 -382 -21777 0
-21773  21774 -21775 -382 -21778 0

c  0+1 --> 1
c    (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧  p_382) -> (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0)
c  in CNF:
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_2
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_1
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨  b^{191, 3}_0
c  in DIMACS:
 21773  21774  21775 -382 -21776 0
 21773  21774  21775 -382 -21777 0
 21773  21774  21775 -382  21778 0

c  1+1 --> 2
c    (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0 ∧  p_382) -> (-b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0)
c  in CNF:
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_2
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨  b^{191, 3}_1
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ -p_382 ∨ -b^{191, 3}_0
c  in DIMACS:
 21773  21774 -21775 -382 -21776 0
 21773  21774 -21775 -382  21777 0
 21773  21774 -21775 -382 -21778 0

c  2+1 --> break 
c    (-b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧  p_382) -> break
c  in CNF:
c     b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ -p_382 ∨ break
c  in DIMACS:
 21773 -21774  21775 -382 1162 0


c  2-1 --> 1
c    (-b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧ -p_382) -> (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0)
c  in CNF:
c     b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_2
c     b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_1
c     b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨  b^{191, 3}_0
c  in DIMACS:
 21773 -21774  21775  382 -21776 0
 21773 -21774  21775  382 -21777 0
 21773 -21774  21775  382  21778 0

c  1-1 --> 0
c    (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0 ∧ -p_382) -> (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧ -b^{191, 3}_0)
c  in CNF:
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_2
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_1
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_0
c  in DIMACS:
 21773  21774 -21775  382 -21776 0
 21773  21774 -21775  382 -21777 0
 21773  21774 -21775  382 -21778 0

c  0-1 --> -1
c    (-b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧ -p_382) -> ( b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0)
c  in CNF:
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨  b^{191, 3}_2
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_1
c     b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨  b^{191, 3}_0
c  in DIMACS:
 21773  21774  21775  382  21776 0
 21773  21774  21775  382 -21777 0
 21773  21774  21775  382  21778 0

c  -1-1 --> -2
c    ( b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧  b^{191, 2}_0 ∧ -p_382) -> ( b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0)
c  in CNF:
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨  b^{191, 3}_2
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨  b^{191, 3}_1
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨  p_382 ∨ -b^{191, 3}_0
c  in DIMACS:
-21773  21774 -21775  382  21776 0
-21773  21774 -21775  382  21777 0
-21773  21774 -21775  382 -21778 0

c  -2-1 --> break 
c    ( b^{191, 2}_2 ∧  b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧ -p_382) -> break
c  in CNF:
c    -b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨  b^{191, 2}_0 ∨  p_382 ∨ break
c  in DIMACS:
-21773 -21774  21775  382 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 2}_2 ∧ -b^{191, 2}_1 ∧ -b^{191, 2}_0 ∧ true) 
c  in CNF:
c    -b^{191, 2}_2 ∨  b^{191, 2}_1 ∨  b^{191, 2}_0 ∨ false 
c  in DIMACS:
-21773  21774  21775  0

c  3 does not represent an automaton state.
c    -(-b^{191, 2}_2 ∧  b^{191, 2}_1 ∧  b^{191, 2}_0 ∧ true) 
c  in CNF:
c     b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ false 
c  in DIMACS:
 21773 -21774 -21775  0
c  -3 does not represent an automaton state.
c    -( b^{191, 2}_2 ∧  b^{191, 2}_1 ∧  b^{191, 2}_0 ∧ true) 
c  in CNF:
c    -b^{191, 2}_2 ∨ -b^{191, 2}_1 ∨ -b^{191, 2}_0 ∨ false 
c  in DIMACS:
-21773 -21774 -21775  0

c i = 3
c  -2+1 --> -1
c    ( b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧  p_573) -> ( b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0)
c  in CNF:
c    -b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨  b^{191, 4}_2
c    -b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_1
c    -b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨  b^{191, 4}_0
c  in DIMACS:
-21776 -21777  21778 -573  21779 0
-21776 -21777  21778 -573 -21780 0
-21776 -21777  21778 -573  21781 0

c  -1+1 --> 0
c    ( b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0 ∧  p_573) -> (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧ -b^{191, 4}_0)
c  in CNF:
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_2
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_1
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_0
c  in DIMACS:
-21776  21777 -21778 -573 -21779 0
-21776  21777 -21778 -573 -21780 0
-21776  21777 -21778 -573 -21781 0

c  0+1 --> 1
c    (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧  p_573) -> (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0)
c  in CNF:
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_2
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_1
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨  b^{191, 4}_0
c  in DIMACS:
 21776  21777  21778 -573 -21779 0
 21776  21777  21778 -573 -21780 0
 21776  21777  21778 -573  21781 0

c  1+1 --> 2
c    (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0 ∧  p_573) -> (-b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0)
c  in CNF:
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_2
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨  b^{191, 4}_1
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ -p_573 ∨ -b^{191, 4}_0
c  in DIMACS:
 21776  21777 -21778 -573 -21779 0
 21776  21777 -21778 -573  21780 0
 21776  21777 -21778 -573 -21781 0

c  2+1 --> break 
c    (-b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧  p_573) -> break
c  in CNF:
c     b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ -p_573 ∨ break
c  in DIMACS:
 21776 -21777  21778 -573 1162 0


c  2-1 --> 1
c    (-b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧ -p_573) -> (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0)
c  in CNF:
c     b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_2
c     b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_1
c     b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨  b^{191, 4}_0
c  in DIMACS:
 21776 -21777  21778  573 -21779 0
 21776 -21777  21778  573 -21780 0
 21776 -21777  21778  573  21781 0

c  1-1 --> 0
c    (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0 ∧ -p_573) -> (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧ -b^{191, 4}_0)
c  in CNF:
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_2
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_1
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_0
c  in DIMACS:
 21776  21777 -21778  573 -21779 0
 21776  21777 -21778  573 -21780 0
 21776  21777 -21778  573 -21781 0

c  0-1 --> -1
c    (-b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧ -p_573) -> ( b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0)
c  in CNF:
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨  b^{191, 4}_2
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_1
c     b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨  b^{191, 4}_0
c  in DIMACS:
 21776  21777  21778  573  21779 0
 21776  21777  21778  573 -21780 0
 21776  21777  21778  573  21781 0

c  -1-1 --> -2
c    ( b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧  b^{191, 3}_0 ∧ -p_573) -> ( b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0)
c  in CNF:
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨  b^{191, 4}_2
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨  b^{191, 4}_1
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨  p_573 ∨ -b^{191, 4}_0
c  in DIMACS:
-21776  21777 -21778  573  21779 0
-21776  21777 -21778  573  21780 0
-21776  21777 -21778  573 -21781 0

c  -2-1 --> break 
c    ( b^{191, 3}_2 ∧  b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧ -p_573) -> break
c  in CNF:
c    -b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨  b^{191, 3}_0 ∨  p_573 ∨ break
c  in DIMACS:
-21776 -21777  21778  573 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 3}_2 ∧ -b^{191, 3}_1 ∧ -b^{191, 3}_0 ∧ true) 
c  in CNF:
c    -b^{191, 3}_2 ∨  b^{191, 3}_1 ∨  b^{191, 3}_0 ∨ false 
c  in DIMACS:
-21776  21777  21778  0

c  3 does not represent an automaton state.
c    -(-b^{191, 3}_2 ∧  b^{191, 3}_1 ∧  b^{191, 3}_0 ∧ true) 
c  in CNF:
c     b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ false 
c  in DIMACS:
 21776 -21777 -21778  0
c  -3 does not represent an automaton state.
c    -( b^{191, 3}_2 ∧  b^{191, 3}_1 ∧  b^{191, 3}_0 ∧ true) 
c  in CNF:
c    -b^{191, 3}_2 ∨ -b^{191, 3}_1 ∨ -b^{191, 3}_0 ∨ false 
c  in DIMACS:
-21776 -21777 -21778  0

c i = 4
c  -2+1 --> -1
c    ( b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧  p_764) -> ( b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0)
c  in CNF:
c    -b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨  b^{191, 5}_2
c    -b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_1
c    -b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨  b^{191, 5}_0
c  in DIMACS:
-21779 -21780  21781 -764  21782 0
-21779 -21780  21781 -764 -21783 0
-21779 -21780  21781 -764  21784 0

c  -1+1 --> 0
c    ( b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0 ∧  p_764) -> (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧ -b^{191, 5}_0)
c  in CNF:
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_2
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_1
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_0
c  in DIMACS:
-21779  21780 -21781 -764 -21782 0
-21779  21780 -21781 -764 -21783 0
-21779  21780 -21781 -764 -21784 0

c  0+1 --> 1
c    (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧  p_764) -> (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0)
c  in CNF:
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_2
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_1
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨  b^{191, 5}_0
c  in DIMACS:
 21779  21780  21781 -764 -21782 0
 21779  21780  21781 -764 -21783 0
 21779  21780  21781 -764  21784 0

c  1+1 --> 2
c    (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0 ∧  p_764) -> (-b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0)
c  in CNF:
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_2
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨  b^{191, 5}_1
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ -p_764 ∨ -b^{191, 5}_0
c  in DIMACS:
 21779  21780 -21781 -764 -21782 0
 21779  21780 -21781 -764  21783 0
 21779  21780 -21781 -764 -21784 0

c  2+1 --> break 
c    (-b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧  p_764) -> break
c  in CNF:
c     b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ -p_764 ∨ break
c  in DIMACS:
 21779 -21780  21781 -764 1162 0


c  2-1 --> 1
c    (-b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧ -p_764) -> (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0)
c  in CNF:
c     b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_2
c     b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_1
c     b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨  b^{191, 5}_0
c  in DIMACS:
 21779 -21780  21781  764 -21782 0
 21779 -21780  21781  764 -21783 0
 21779 -21780  21781  764  21784 0

c  1-1 --> 0
c    (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0 ∧ -p_764) -> (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧ -b^{191, 5}_0)
c  in CNF:
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_2
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_1
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_0
c  in DIMACS:
 21779  21780 -21781  764 -21782 0
 21779  21780 -21781  764 -21783 0
 21779  21780 -21781  764 -21784 0

c  0-1 --> -1
c    (-b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧ -p_764) -> ( b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0)
c  in CNF:
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨  b^{191, 5}_2
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_1
c     b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨  b^{191, 5}_0
c  in DIMACS:
 21779  21780  21781  764  21782 0
 21779  21780  21781  764 -21783 0
 21779  21780  21781  764  21784 0

c  -1-1 --> -2
c    ( b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧  b^{191, 4}_0 ∧ -p_764) -> ( b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0)
c  in CNF:
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨  b^{191, 5}_2
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨  b^{191, 5}_1
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨  p_764 ∨ -b^{191, 5}_0
c  in DIMACS:
-21779  21780 -21781  764  21782 0
-21779  21780 -21781  764  21783 0
-21779  21780 -21781  764 -21784 0

c  -2-1 --> break 
c    ( b^{191, 4}_2 ∧  b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧ -p_764) -> break
c  in CNF:
c    -b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨  b^{191, 4}_0 ∨  p_764 ∨ break
c  in DIMACS:
-21779 -21780  21781  764 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 4}_2 ∧ -b^{191, 4}_1 ∧ -b^{191, 4}_0 ∧ true) 
c  in CNF:
c    -b^{191, 4}_2 ∨  b^{191, 4}_1 ∨  b^{191, 4}_0 ∨ false 
c  in DIMACS:
-21779  21780  21781  0

c  3 does not represent an automaton state.
c    -(-b^{191, 4}_2 ∧  b^{191, 4}_1 ∧  b^{191, 4}_0 ∧ true) 
c  in CNF:
c     b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ false 
c  in DIMACS:
 21779 -21780 -21781  0
c  -3 does not represent an automaton state.
c    -( b^{191, 4}_2 ∧  b^{191, 4}_1 ∧  b^{191, 4}_0 ∧ true) 
c  in CNF:
c    -b^{191, 4}_2 ∨ -b^{191, 4}_1 ∨ -b^{191, 4}_0 ∨ false 
c  in DIMACS:
-21779 -21780 -21781  0

c i = 5
c  -2+1 --> -1
c    ( b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧  p_955) -> ( b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0)
c  in CNF:
c    -b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨  b^{191, 6}_2
c    -b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_1
c    -b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨  b^{191, 6}_0
c  in DIMACS:
-21782 -21783  21784 -955  21785 0
-21782 -21783  21784 -955 -21786 0
-21782 -21783  21784 -955  21787 0

c  -1+1 --> 0
c    ( b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0 ∧  p_955) -> (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧ -b^{191, 6}_0)
c  in CNF:
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_2
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_1
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_0
c  in DIMACS:
-21782  21783 -21784 -955 -21785 0
-21782  21783 -21784 -955 -21786 0
-21782  21783 -21784 -955 -21787 0

c  0+1 --> 1
c    (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧  p_955) -> (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0)
c  in CNF:
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_2
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_1
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨  b^{191, 6}_0
c  in DIMACS:
 21782  21783  21784 -955 -21785 0
 21782  21783  21784 -955 -21786 0
 21782  21783  21784 -955  21787 0

c  1+1 --> 2
c    (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0 ∧  p_955) -> (-b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0)
c  in CNF:
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_2
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨  b^{191, 6}_1
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ -p_955 ∨ -b^{191, 6}_0
c  in DIMACS:
 21782  21783 -21784 -955 -21785 0
 21782  21783 -21784 -955  21786 0
 21782  21783 -21784 -955 -21787 0

c  2+1 --> break 
c    (-b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧  p_955) -> break
c  in CNF:
c     b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ -p_955 ∨ break
c  in DIMACS:
 21782 -21783  21784 -955 1162 0


c  2-1 --> 1
c    (-b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧ -p_955) -> (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0)
c  in CNF:
c     b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_2
c     b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_1
c     b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨  b^{191, 6}_0
c  in DIMACS:
 21782 -21783  21784  955 -21785 0
 21782 -21783  21784  955 -21786 0
 21782 -21783  21784  955  21787 0

c  1-1 --> 0
c    (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0 ∧ -p_955) -> (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧ -b^{191, 6}_0)
c  in CNF:
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_2
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_1
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_0
c  in DIMACS:
 21782  21783 -21784  955 -21785 0
 21782  21783 -21784  955 -21786 0
 21782  21783 -21784  955 -21787 0

c  0-1 --> -1
c    (-b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧ -p_955) -> ( b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0)
c  in CNF:
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨  b^{191, 6}_2
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_1
c     b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨  b^{191, 6}_0
c  in DIMACS:
 21782  21783  21784  955  21785 0
 21782  21783  21784  955 -21786 0
 21782  21783  21784  955  21787 0

c  -1-1 --> -2
c    ( b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧  b^{191, 5}_0 ∧ -p_955) -> ( b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0)
c  in CNF:
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨  b^{191, 6}_2
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨  b^{191, 6}_1
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨  p_955 ∨ -b^{191, 6}_0
c  in DIMACS:
-21782  21783 -21784  955  21785 0
-21782  21783 -21784  955  21786 0
-21782  21783 -21784  955 -21787 0

c  -2-1 --> break 
c    ( b^{191, 5}_2 ∧  b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧ -p_955) -> break
c  in CNF:
c    -b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨  b^{191, 5}_0 ∨  p_955 ∨ break
c  in DIMACS:
-21782 -21783  21784  955 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 5}_2 ∧ -b^{191, 5}_1 ∧ -b^{191, 5}_0 ∧ true) 
c  in CNF:
c    -b^{191, 5}_2 ∨  b^{191, 5}_1 ∨  b^{191, 5}_0 ∨ false 
c  in DIMACS:
-21782  21783  21784  0

c  3 does not represent an automaton state.
c    -(-b^{191, 5}_2 ∧  b^{191, 5}_1 ∧  b^{191, 5}_0 ∧ true) 
c  in CNF:
c     b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ false 
c  in DIMACS:
 21782 -21783 -21784  0
c  -3 does not represent an automaton state.
c    -( b^{191, 5}_2 ∧  b^{191, 5}_1 ∧  b^{191, 5}_0 ∧ true) 
c  in CNF:
c    -b^{191, 5}_2 ∨ -b^{191, 5}_1 ∨ -b^{191, 5}_0 ∨ false 
c  in DIMACS:
-21782 -21783 -21784  0

c i = 6
c  -2+1 --> -1
c    ( b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧  p_1146) -> ( b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧  b^{191, 7}_0)
c  in CNF:
c    -b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨  b^{191, 7}_2
c    -b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_1
c    -b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨  b^{191, 7}_0
c  in DIMACS:
-21785 -21786  21787 -1146  21788 0
-21785 -21786  21787 -1146 -21789 0
-21785 -21786  21787 -1146  21790 0

c  -1+1 --> 0
c    ( b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0 ∧  p_1146) -> (-b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧ -b^{191, 7}_0)
c  in CNF:
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_2
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_1
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_0
c  in DIMACS:
-21785  21786 -21787 -1146 -21788 0
-21785  21786 -21787 -1146 -21789 0
-21785  21786 -21787 -1146 -21790 0

c  0+1 --> 1
c    (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧  p_1146) -> (-b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧  b^{191, 7}_0)
c  in CNF:
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_2
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_1
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨  b^{191, 7}_0
c  in DIMACS:
 21785  21786  21787 -1146 -21788 0
 21785  21786  21787 -1146 -21789 0
 21785  21786  21787 -1146  21790 0

c  1+1 --> 2
c    (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0 ∧  p_1146) -> (-b^{191, 7}_2 ∧  b^{191, 7}_1 ∧ -b^{191, 7}_0)
c  in CNF:
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_2
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨  b^{191, 7}_1
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ -p_1146 ∨ -b^{191, 7}_0
c  in DIMACS:
 21785  21786 -21787 -1146 -21788 0
 21785  21786 -21787 -1146  21789 0
 21785  21786 -21787 -1146 -21790 0

c  2+1 --> break 
c    (-b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 21785 -21786  21787 -1146 1162 0


c  2-1 --> 1
c    (-b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧ -p_1146) -> (-b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧  b^{191, 7}_0)
c  in CNF:
c     b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_2
c     b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_1
c     b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨  b^{191, 7}_0
c  in DIMACS:
 21785 -21786  21787  1146 -21788 0
 21785 -21786  21787  1146 -21789 0
 21785 -21786  21787  1146  21790 0

c  1-1 --> 0
c    (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0 ∧ -p_1146) -> (-b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧ -b^{191, 7}_0)
c  in CNF:
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_2
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_1
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_0
c  in DIMACS:
 21785  21786 -21787  1146 -21788 0
 21785  21786 -21787  1146 -21789 0
 21785  21786 -21787  1146 -21790 0

c  0-1 --> -1
c    (-b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧ -p_1146) -> ( b^{191, 7}_2 ∧ -b^{191, 7}_1 ∧  b^{191, 7}_0)
c  in CNF:
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨  b^{191, 7}_2
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_1
c     b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨  b^{191, 7}_0
c  in DIMACS:
 21785  21786  21787  1146  21788 0
 21785  21786  21787  1146 -21789 0
 21785  21786  21787  1146  21790 0

c  -1-1 --> -2
c    ( b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧  b^{191, 6}_0 ∧ -p_1146) -> ( b^{191, 7}_2 ∧  b^{191, 7}_1 ∧ -b^{191, 7}_0)
c  in CNF:
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨  b^{191, 7}_2
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨  b^{191, 7}_1
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨  p_1146 ∨ -b^{191, 7}_0
c  in DIMACS:
-21785  21786 -21787  1146  21788 0
-21785  21786 -21787  1146  21789 0
-21785  21786 -21787  1146 -21790 0

c  -2-1 --> break 
c    ( b^{191, 6}_2 ∧  b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨  b^{191, 6}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-21785 -21786  21787  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{191, 6}_2 ∧ -b^{191, 6}_1 ∧ -b^{191, 6}_0 ∧ true) 
c  in CNF:
c    -b^{191, 6}_2 ∨  b^{191, 6}_1 ∨  b^{191, 6}_0 ∨ false 
c  in DIMACS:
-21785  21786  21787  0

c  3 does not represent an automaton state.
c    -(-b^{191, 6}_2 ∧  b^{191, 6}_1 ∧  b^{191, 6}_0 ∧ true) 
c  in CNF:
c     b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ false 
c  in DIMACS:
 21785 -21786 -21787  0
c  -3 does not represent an automaton state.
c    -( b^{191, 6}_2 ∧  b^{191, 6}_1 ∧  b^{191, 6}_0 ∧ true) 
c  in CNF:
c    -b^{191, 6}_2 ∨ -b^{191, 6}_1 ∨ -b^{191, 6}_0 ∨ false 
c  in DIMACS:
-21785 -21786 -21787  0

c INIT for k = 192
c    -b^{192, 1}_2
c    -b^{192, 1}_1
c    -b^{192, 1}_0
c  in DIMACS:
-21791 0
-21792 0
-21793 0

c Transitions for k = 192
c i = 1
c  -2+1 --> -1
c    ( b^{192, 1}_2 ∧  b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧  p_192) -> ( b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0)
c  in CNF:
c    -b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨  b^{192, 2}_2
c    -b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_1
c    -b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨  b^{192, 2}_0
c  in DIMACS:
-21791 -21792  21793 -192  21794 0
-21791 -21792  21793 -192 -21795 0
-21791 -21792  21793 -192  21796 0

c  -1+1 --> 0
c    ( b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧  b^{192, 1}_0 ∧  p_192) -> (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧ -b^{192, 2}_0)
c  in CNF:
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_2
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_1
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_0
c  in DIMACS:
-21791  21792 -21793 -192 -21794 0
-21791  21792 -21793 -192 -21795 0
-21791  21792 -21793 -192 -21796 0

c  0+1 --> 1
c    (-b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧  p_192) -> (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0)
c  in CNF:
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_2
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_1
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨  b^{192, 2}_0
c  in DIMACS:
 21791  21792  21793 -192 -21794 0
 21791  21792  21793 -192 -21795 0
 21791  21792  21793 -192  21796 0

c  1+1 --> 2
c    (-b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧  b^{192, 1}_0 ∧  p_192) -> (-b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0)
c  in CNF:
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_2
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨  b^{192, 2}_1
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ -p_192 ∨ -b^{192, 2}_0
c  in DIMACS:
 21791  21792 -21793 -192 -21794 0
 21791  21792 -21793 -192  21795 0
 21791  21792 -21793 -192 -21796 0

c  2+1 --> break 
c    (-b^{192, 1}_2 ∧  b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧  p_192) -> break
c  in CNF:
c     b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ -p_192 ∨ break
c  in DIMACS:
 21791 -21792  21793 -192 1162 0


c  2-1 --> 1
c    (-b^{192, 1}_2 ∧  b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧ -p_192) -> (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0)
c  in CNF:
c     b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_2
c     b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_1
c     b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨  b^{192, 2}_0
c  in DIMACS:
 21791 -21792  21793  192 -21794 0
 21791 -21792  21793  192 -21795 0
 21791 -21792  21793  192  21796 0

c  1-1 --> 0
c    (-b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧  b^{192, 1}_0 ∧ -p_192) -> (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧ -b^{192, 2}_0)
c  in CNF:
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_2
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_1
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_0
c  in DIMACS:
 21791  21792 -21793  192 -21794 0
 21791  21792 -21793  192 -21795 0
 21791  21792 -21793  192 -21796 0

c  0-1 --> -1
c    (-b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧ -p_192) -> ( b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0)
c  in CNF:
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨  b^{192, 2}_2
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_1
c     b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨  b^{192, 2}_0
c  in DIMACS:
 21791  21792  21793  192  21794 0
 21791  21792  21793  192 -21795 0
 21791  21792  21793  192  21796 0

c  -1-1 --> -2
c    ( b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧  b^{192, 1}_0 ∧ -p_192) -> ( b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0)
c  in CNF:
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨  b^{192, 2}_2
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨  b^{192, 2}_1
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨  p_192 ∨ -b^{192, 2}_0
c  in DIMACS:
-21791  21792 -21793  192  21794 0
-21791  21792 -21793  192  21795 0
-21791  21792 -21793  192 -21796 0

c  -2-1 --> break 
c    ( b^{192, 1}_2 ∧  b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧ -p_192) -> break
c  in CNF:
c    -b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨  b^{192, 1}_0 ∨  p_192 ∨ break
c  in DIMACS:
-21791 -21792  21793  192 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 1}_2 ∧ -b^{192, 1}_1 ∧ -b^{192, 1}_0 ∧ true) 
c  in CNF:
c    -b^{192, 1}_2 ∨  b^{192, 1}_1 ∨  b^{192, 1}_0 ∨ false 
c  in DIMACS:
-21791  21792  21793  0

c  3 does not represent an automaton state.
c    -(-b^{192, 1}_2 ∧  b^{192, 1}_1 ∧  b^{192, 1}_0 ∧ true) 
c  in CNF:
c     b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ false 
c  in DIMACS:
 21791 -21792 -21793  0
c  -3 does not represent an automaton state.
c    -( b^{192, 1}_2 ∧  b^{192, 1}_1 ∧  b^{192, 1}_0 ∧ true) 
c  in CNF:
c    -b^{192, 1}_2 ∨ -b^{192, 1}_1 ∨ -b^{192, 1}_0 ∨ false 
c  in DIMACS:
-21791 -21792 -21793  0

c i = 2
c  -2+1 --> -1
c    ( b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧  p_384) -> ( b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0)
c  in CNF:
c    -b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨  b^{192, 3}_2
c    -b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_1
c    -b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨  b^{192, 3}_0
c  in DIMACS:
-21794 -21795  21796 -384  21797 0
-21794 -21795  21796 -384 -21798 0
-21794 -21795  21796 -384  21799 0

c  -1+1 --> 0
c    ( b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0 ∧  p_384) -> (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧ -b^{192, 3}_0)
c  in CNF:
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_2
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_1
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_0
c  in DIMACS:
-21794  21795 -21796 -384 -21797 0
-21794  21795 -21796 -384 -21798 0
-21794  21795 -21796 -384 -21799 0

c  0+1 --> 1
c    (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧  p_384) -> (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0)
c  in CNF:
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_2
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_1
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨  b^{192, 3}_0
c  in DIMACS:
 21794  21795  21796 -384 -21797 0
 21794  21795  21796 -384 -21798 0
 21794  21795  21796 -384  21799 0

c  1+1 --> 2
c    (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0 ∧  p_384) -> (-b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0)
c  in CNF:
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_2
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨  b^{192, 3}_1
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ -p_384 ∨ -b^{192, 3}_0
c  in DIMACS:
 21794  21795 -21796 -384 -21797 0
 21794  21795 -21796 -384  21798 0
 21794  21795 -21796 -384 -21799 0

c  2+1 --> break 
c    (-b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧  p_384) -> break
c  in CNF:
c     b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 21794 -21795  21796 -384 1162 0


c  2-1 --> 1
c    (-b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧ -p_384) -> (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0)
c  in CNF:
c     b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_2
c     b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_1
c     b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨  b^{192, 3}_0
c  in DIMACS:
 21794 -21795  21796  384 -21797 0
 21794 -21795  21796  384 -21798 0
 21794 -21795  21796  384  21799 0

c  1-1 --> 0
c    (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0 ∧ -p_384) -> (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧ -b^{192, 3}_0)
c  in CNF:
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_2
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_1
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_0
c  in DIMACS:
 21794  21795 -21796  384 -21797 0
 21794  21795 -21796  384 -21798 0
 21794  21795 -21796  384 -21799 0

c  0-1 --> -1
c    (-b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧ -p_384) -> ( b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0)
c  in CNF:
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨  b^{192, 3}_2
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_1
c     b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨  b^{192, 3}_0
c  in DIMACS:
 21794  21795  21796  384  21797 0
 21794  21795  21796  384 -21798 0
 21794  21795  21796  384  21799 0

c  -1-1 --> -2
c    ( b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧  b^{192, 2}_0 ∧ -p_384) -> ( b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0)
c  in CNF:
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨  b^{192, 3}_2
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨  b^{192, 3}_1
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨  p_384 ∨ -b^{192, 3}_0
c  in DIMACS:
-21794  21795 -21796  384  21797 0
-21794  21795 -21796  384  21798 0
-21794  21795 -21796  384 -21799 0

c  -2-1 --> break 
c    ( b^{192, 2}_2 ∧  b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨  b^{192, 2}_0 ∨  p_384 ∨ break
c  in DIMACS:
-21794 -21795  21796  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 2}_2 ∧ -b^{192, 2}_1 ∧ -b^{192, 2}_0 ∧ true) 
c  in CNF:
c    -b^{192, 2}_2 ∨  b^{192, 2}_1 ∨  b^{192, 2}_0 ∨ false 
c  in DIMACS:
-21794  21795  21796  0

c  3 does not represent an automaton state.
c    -(-b^{192, 2}_2 ∧  b^{192, 2}_1 ∧  b^{192, 2}_0 ∧ true) 
c  in CNF:
c     b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ false 
c  in DIMACS:
 21794 -21795 -21796  0
c  -3 does not represent an automaton state.
c    -( b^{192, 2}_2 ∧  b^{192, 2}_1 ∧  b^{192, 2}_0 ∧ true) 
c  in CNF:
c    -b^{192, 2}_2 ∨ -b^{192, 2}_1 ∨ -b^{192, 2}_0 ∨ false 
c  in DIMACS:
-21794 -21795 -21796  0

c i = 3
c  -2+1 --> -1
c    ( b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧  p_576) -> ( b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0)
c  in CNF:
c    -b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨  b^{192, 4}_2
c    -b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_1
c    -b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨  b^{192, 4}_0
c  in DIMACS:
-21797 -21798  21799 -576  21800 0
-21797 -21798  21799 -576 -21801 0
-21797 -21798  21799 -576  21802 0

c  -1+1 --> 0
c    ( b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0 ∧  p_576) -> (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧ -b^{192, 4}_0)
c  in CNF:
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_2
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_1
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_0
c  in DIMACS:
-21797  21798 -21799 -576 -21800 0
-21797  21798 -21799 -576 -21801 0
-21797  21798 -21799 -576 -21802 0

c  0+1 --> 1
c    (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧  p_576) -> (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0)
c  in CNF:
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_2
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_1
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨  b^{192, 4}_0
c  in DIMACS:
 21797  21798  21799 -576 -21800 0
 21797  21798  21799 -576 -21801 0
 21797  21798  21799 -576  21802 0

c  1+1 --> 2
c    (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0 ∧  p_576) -> (-b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0)
c  in CNF:
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_2
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨  b^{192, 4}_1
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ -p_576 ∨ -b^{192, 4}_0
c  in DIMACS:
 21797  21798 -21799 -576 -21800 0
 21797  21798 -21799 -576  21801 0
 21797  21798 -21799 -576 -21802 0

c  2+1 --> break 
c    (-b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧  p_576) -> break
c  in CNF:
c     b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 21797 -21798  21799 -576 1162 0


c  2-1 --> 1
c    (-b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧ -p_576) -> (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0)
c  in CNF:
c     b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_2
c     b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_1
c     b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨  b^{192, 4}_0
c  in DIMACS:
 21797 -21798  21799  576 -21800 0
 21797 -21798  21799  576 -21801 0
 21797 -21798  21799  576  21802 0

c  1-1 --> 0
c    (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0 ∧ -p_576) -> (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧ -b^{192, 4}_0)
c  in CNF:
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_2
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_1
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_0
c  in DIMACS:
 21797  21798 -21799  576 -21800 0
 21797  21798 -21799  576 -21801 0
 21797  21798 -21799  576 -21802 0

c  0-1 --> -1
c    (-b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧ -p_576) -> ( b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0)
c  in CNF:
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨  b^{192, 4}_2
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_1
c     b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨  b^{192, 4}_0
c  in DIMACS:
 21797  21798  21799  576  21800 0
 21797  21798  21799  576 -21801 0
 21797  21798  21799  576  21802 0

c  -1-1 --> -2
c    ( b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧  b^{192, 3}_0 ∧ -p_576) -> ( b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0)
c  in CNF:
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨  b^{192, 4}_2
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨  b^{192, 4}_1
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨  p_576 ∨ -b^{192, 4}_0
c  in DIMACS:
-21797  21798 -21799  576  21800 0
-21797  21798 -21799  576  21801 0
-21797  21798 -21799  576 -21802 0

c  -2-1 --> break 
c    ( b^{192, 3}_2 ∧  b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨  b^{192, 3}_0 ∨  p_576 ∨ break
c  in DIMACS:
-21797 -21798  21799  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 3}_2 ∧ -b^{192, 3}_1 ∧ -b^{192, 3}_0 ∧ true) 
c  in CNF:
c    -b^{192, 3}_2 ∨  b^{192, 3}_1 ∨  b^{192, 3}_0 ∨ false 
c  in DIMACS:
-21797  21798  21799  0

c  3 does not represent an automaton state.
c    -(-b^{192, 3}_2 ∧  b^{192, 3}_1 ∧  b^{192, 3}_0 ∧ true) 
c  in CNF:
c     b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ false 
c  in DIMACS:
 21797 -21798 -21799  0
c  -3 does not represent an automaton state.
c    -( b^{192, 3}_2 ∧  b^{192, 3}_1 ∧  b^{192, 3}_0 ∧ true) 
c  in CNF:
c    -b^{192, 3}_2 ∨ -b^{192, 3}_1 ∨ -b^{192, 3}_0 ∨ false 
c  in DIMACS:
-21797 -21798 -21799  0

c i = 4
c  -2+1 --> -1
c    ( b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧  p_768) -> ( b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0)
c  in CNF:
c    -b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨  b^{192, 5}_2
c    -b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_1
c    -b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨  b^{192, 5}_0
c  in DIMACS:
-21800 -21801  21802 -768  21803 0
-21800 -21801  21802 -768 -21804 0
-21800 -21801  21802 -768  21805 0

c  -1+1 --> 0
c    ( b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0 ∧  p_768) -> (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧ -b^{192, 5}_0)
c  in CNF:
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_2
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_1
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_0
c  in DIMACS:
-21800  21801 -21802 -768 -21803 0
-21800  21801 -21802 -768 -21804 0
-21800  21801 -21802 -768 -21805 0

c  0+1 --> 1
c    (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧  p_768) -> (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0)
c  in CNF:
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_2
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_1
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨  b^{192, 5}_0
c  in DIMACS:
 21800  21801  21802 -768 -21803 0
 21800  21801  21802 -768 -21804 0
 21800  21801  21802 -768  21805 0

c  1+1 --> 2
c    (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0 ∧  p_768) -> (-b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0)
c  in CNF:
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_2
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨  b^{192, 5}_1
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ -p_768 ∨ -b^{192, 5}_0
c  in DIMACS:
 21800  21801 -21802 -768 -21803 0
 21800  21801 -21802 -768  21804 0
 21800  21801 -21802 -768 -21805 0

c  2+1 --> break 
c    (-b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧  p_768) -> break
c  in CNF:
c     b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 21800 -21801  21802 -768 1162 0


c  2-1 --> 1
c    (-b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧ -p_768) -> (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0)
c  in CNF:
c     b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_2
c     b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_1
c     b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨  b^{192, 5}_0
c  in DIMACS:
 21800 -21801  21802  768 -21803 0
 21800 -21801  21802  768 -21804 0
 21800 -21801  21802  768  21805 0

c  1-1 --> 0
c    (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0 ∧ -p_768) -> (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧ -b^{192, 5}_0)
c  in CNF:
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_2
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_1
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_0
c  in DIMACS:
 21800  21801 -21802  768 -21803 0
 21800  21801 -21802  768 -21804 0
 21800  21801 -21802  768 -21805 0

c  0-1 --> -1
c    (-b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧ -p_768) -> ( b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0)
c  in CNF:
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨  b^{192, 5}_2
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_1
c     b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨  b^{192, 5}_0
c  in DIMACS:
 21800  21801  21802  768  21803 0
 21800  21801  21802  768 -21804 0
 21800  21801  21802  768  21805 0

c  -1-1 --> -2
c    ( b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧  b^{192, 4}_0 ∧ -p_768) -> ( b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0)
c  in CNF:
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨  b^{192, 5}_2
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨  b^{192, 5}_1
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨  p_768 ∨ -b^{192, 5}_0
c  in DIMACS:
-21800  21801 -21802  768  21803 0
-21800  21801 -21802  768  21804 0
-21800  21801 -21802  768 -21805 0

c  -2-1 --> break 
c    ( b^{192, 4}_2 ∧  b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨  b^{192, 4}_0 ∨  p_768 ∨ break
c  in DIMACS:
-21800 -21801  21802  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 4}_2 ∧ -b^{192, 4}_1 ∧ -b^{192, 4}_0 ∧ true) 
c  in CNF:
c    -b^{192, 4}_2 ∨  b^{192, 4}_1 ∨  b^{192, 4}_0 ∨ false 
c  in DIMACS:
-21800  21801  21802  0

c  3 does not represent an automaton state.
c    -(-b^{192, 4}_2 ∧  b^{192, 4}_1 ∧  b^{192, 4}_0 ∧ true) 
c  in CNF:
c     b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ false 
c  in DIMACS:
 21800 -21801 -21802  0
c  -3 does not represent an automaton state.
c    -( b^{192, 4}_2 ∧  b^{192, 4}_1 ∧  b^{192, 4}_0 ∧ true) 
c  in CNF:
c    -b^{192, 4}_2 ∨ -b^{192, 4}_1 ∨ -b^{192, 4}_0 ∨ false 
c  in DIMACS:
-21800 -21801 -21802  0

c i = 5
c  -2+1 --> -1
c    ( b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧  p_960) -> ( b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0)
c  in CNF:
c    -b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨  b^{192, 6}_2
c    -b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_1
c    -b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨  b^{192, 6}_0
c  in DIMACS:
-21803 -21804  21805 -960  21806 0
-21803 -21804  21805 -960 -21807 0
-21803 -21804  21805 -960  21808 0

c  -1+1 --> 0
c    ( b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0 ∧  p_960) -> (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧ -b^{192, 6}_0)
c  in CNF:
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_2
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_1
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_0
c  in DIMACS:
-21803  21804 -21805 -960 -21806 0
-21803  21804 -21805 -960 -21807 0
-21803  21804 -21805 -960 -21808 0

c  0+1 --> 1
c    (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧  p_960) -> (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0)
c  in CNF:
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_2
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_1
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨  b^{192, 6}_0
c  in DIMACS:
 21803  21804  21805 -960 -21806 0
 21803  21804  21805 -960 -21807 0
 21803  21804  21805 -960  21808 0

c  1+1 --> 2
c    (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0 ∧  p_960) -> (-b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0)
c  in CNF:
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_2
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨  b^{192, 6}_1
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ -p_960 ∨ -b^{192, 6}_0
c  in DIMACS:
 21803  21804 -21805 -960 -21806 0
 21803  21804 -21805 -960  21807 0
 21803  21804 -21805 -960 -21808 0

c  2+1 --> break 
c    (-b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧  p_960) -> break
c  in CNF:
c     b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 21803 -21804  21805 -960 1162 0


c  2-1 --> 1
c    (-b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧ -p_960) -> (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0)
c  in CNF:
c     b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_2
c     b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_1
c     b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨  b^{192, 6}_0
c  in DIMACS:
 21803 -21804  21805  960 -21806 0
 21803 -21804  21805  960 -21807 0
 21803 -21804  21805  960  21808 0

c  1-1 --> 0
c    (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0 ∧ -p_960) -> (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧ -b^{192, 6}_0)
c  in CNF:
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_2
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_1
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_0
c  in DIMACS:
 21803  21804 -21805  960 -21806 0
 21803  21804 -21805  960 -21807 0
 21803  21804 -21805  960 -21808 0

c  0-1 --> -1
c    (-b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧ -p_960) -> ( b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0)
c  in CNF:
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨  b^{192, 6}_2
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_1
c     b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨  b^{192, 6}_0
c  in DIMACS:
 21803  21804  21805  960  21806 0
 21803  21804  21805  960 -21807 0
 21803  21804  21805  960  21808 0

c  -1-1 --> -2
c    ( b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧  b^{192, 5}_0 ∧ -p_960) -> ( b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0)
c  in CNF:
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨  b^{192, 6}_2
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨  b^{192, 6}_1
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨  p_960 ∨ -b^{192, 6}_0
c  in DIMACS:
-21803  21804 -21805  960  21806 0
-21803  21804 -21805  960  21807 0
-21803  21804 -21805  960 -21808 0

c  -2-1 --> break 
c    ( b^{192, 5}_2 ∧  b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨  b^{192, 5}_0 ∨  p_960 ∨ break
c  in DIMACS:
-21803 -21804  21805  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 5}_2 ∧ -b^{192, 5}_1 ∧ -b^{192, 5}_0 ∧ true) 
c  in CNF:
c    -b^{192, 5}_2 ∨  b^{192, 5}_1 ∨  b^{192, 5}_0 ∨ false 
c  in DIMACS:
-21803  21804  21805  0

c  3 does not represent an automaton state.
c    -(-b^{192, 5}_2 ∧  b^{192, 5}_1 ∧  b^{192, 5}_0 ∧ true) 
c  in CNF:
c     b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ false 
c  in DIMACS:
 21803 -21804 -21805  0
c  -3 does not represent an automaton state.
c    -( b^{192, 5}_2 ∧  b^{192, 5}_1 ∧  b^{192, 5}_0 ∧ true) 
c  in CNF:
c    -b^{192, 5}_2 ∨ -b^{192, 5}_1 ∨ -b^{192, 5}_0 ∨ false 
c  in DIMACS:
-21803 -21804 -21805  0

c i = 6
c  -2+1 --> -1
c    ( b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧  p_1152) -> ( b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧  b^{192, 7}_0)
c  in CNF:
c    -b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨  b^{192, 7}_2
c    -b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_1
c    -b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨  b^{192, 7}_0
c  in DIMACS:
-21806 -21807  21808 -1152  21809 0
-21806 -21807  21808 -1152 -21810 0
-21806 -21807  21808 -1152  21811 0

c  -1+1 --> 0
c    ( b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0 ∧  p_1152) -> (-b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧ -b^{192, 7}_0)
c  in CNF:
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_2
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_1
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_0
c  in DIMACS:
-21806  21807 -21808 -1152 -21809 0
-21806  21807 -21808 -1152 -21810 0
-21806  21807 -21808 -1152 -21811 0

c  0+1 --> 1
c    (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧  p_1152) -> (-b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧  b^{192, 7}_0)
c  in CNF:
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_2
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_1
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨  b^{192, 7}_0
c  in DIMACS:
 21806  21807  21808 -1152 -21809 0
 21806  21807  21808 -1152 -21810 0
 21806  21807  21808 -1152  21811 0

c  1+1 --> 2
c    (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0 ∧  p_1152) -> (-b^{192, 7}_2 ∧  b^{192, 7}_1 ∧ -b^{192, 7}_0)
c  in CNF:
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_2
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨  b^{192, 7}_1
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ -p_1152 ∨ -b^{192, 7}_0
c  in DIMACS:
 21806  21807 -21808 -1152 -21809 0
 21806  21807 -21808 -1152  21810 0
 21806  21807 -21808 -1152 -21811 0

c  2+1 --> break 
c    (-b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 21806 -21807  21808 -1152 1162 0


c  2-1 --> 1
c    (-b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧ -p_1152) -> (-b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧  b^{192, 7}_0)
c  in CNF:
c     b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_2
c     b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_1
c     b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨  b^{192, 7}_0
c  in DIMACS:
 21806 -21807  21808  1152 -21809 0
 21806 -21807  21808  1152 -21810 0
 21806 -21807  21808  1152  21811 0

c  1-1 --> 0
c    (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0 ∧ -p_1152) -> (-b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧ -b^{192, 7}_0)
c  in CNF:
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_2
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_1
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_0
c  in DIMACS:
 21806  21807 -21808  1152 -21809 0
 21806  21807 -21808  1152 -21810 0
 21806  21807 -21808  1152 -21811 0

c  0-1 --> -1
c    (-b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧ -p_1152) -> ( b^{192, 7}_2 ∧ -b^{192, 7}_1 ∧  b^{192, 7}_0)
c  in CNF:
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨  b^{192, 7}_2
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_1
c     b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨  b^{192, 7}_0
c  in DIMACS:
 21806  21807  21808  1152  21809 0
 21806  21807  21808  1152 -21810 0
 21806  21807  21808  1152  21811 0

c  -1-1 --> -2
c    ( b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧  b^{192, 6}_0 ∧ -p_1152) -> ( b^{192, 7}_2 ∧  b^{192, 7}_1 ∧ -b^{192, 7}_0)
c  in CNF:
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨  b^{192, 7}_2
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨  b^{192, 7}_1
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨  p_1152 ∨ -b^{192, 7}_0
c  in DIMACS:
-21806  21807 -21808  1152  21809 0
-21806  21807 -21808  1152  21810 0
-21806  21807 -21808  1152 -21811 0

c  -2-1 --> break 
c    ( b^{192, 6}_2 ∧  b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨  b^{192, 6}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-21806 -21807  21808  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{192, 6}_2 ∧ -b^{192, 6}_1 ∧ -b^{192, 6}_0 ∧ true) 
c  in CNF:
c    -b^{192, 6}_2 ∨  b^{192, 6}_1 ∨  b^{192, 6}_0 ∨ false 
c  in DIMACS:
-21806  21807  21808  0

c  3 does not represent an automaton state.
c    -(-b^{192, 6}_2 ∧  b^{192, 6}_1 ∧  b^{192, 6}_0 ∧ true) 
c  in CNF:
c     b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ false 
c  in DIMACS:
 21806 -21807 -21808  0
c  -3 does not represent an automaton state.
c    -( b^{192, 6}_2 ∧  b^{192, 6}_1 ∧  b^{192, 6}_0 ∧ true) 
c  in CNF:
c    -b^{192, 6}_2 ∨ -b^{192, 6}_1 ∨ -b^{192, 6}_0 ∨ false 
c  in DIMACS:
-21806 -21807 -21808  0

c INIT for k = 193
c    -b^{193, 1}_2
c    -b^{193, 1}_1
c    -b^{193, 1}_0
c  in DIMACS:
-21812 0
-21813 0
-21814 0

c Transitions for k = 193
c i = 1
c  -2+1 --> -1
c    ( b^{193, 1}_2 ∧  b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧  p_193) -> ( b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0)
c  in CNF:
c    -b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨  b^{193, 2}_2
c    -b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_1
c    -b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨  b^{193, 2}_0
c  in DIMACS:
-21812 -21813  21814 -193  21815 0
-21812 -21813  21814 -193 -21816 0
-21812 -21813  21814 -193  21817 0

c  -1+1 --> 0
c    ( b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧  b^{193, 1}_0 ∧  p_193) -> (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧ -b^{193, 2}_0)
c  in CNF:
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_2
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_1
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_0
c  in DIMACS:
-21812  21813 -21814 -193 -21815 0
-21812  21813 -21814 -193 -21816 0
-21812  21813 -21814 -193 -21817 0

c  0+1 --> 1
c    (-b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧  p_193) -> (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0)
c  in CNF:
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_2
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_1
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨  b^{193, 2}_0
c  in DIMACS:
 21812  21813  21814 -193 -21815 0
 21812  21813  21814 -193 -21816 0
 21812  21813  21814 -193  21817 0

c  1+1 --> 2
c    (-b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧  b^{193, 1}_0 ∧  p_193) -> (-b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0)
c  in CNF:
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_2
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨  b^{193, 2}_1
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ -p_193 ∨ -b^{193, 2}_0
c  in DIMACS:
 21812  21813 -21814 -193 -21815 0
 21812  21813 -21814 -193  21816 0
 21812  21813 -21814 -193 -21817 0

c  2+1 --> break 
c    (-b^{193, 1}_2 ∧  b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧  p_193) -> break
c  in CNF:
c     b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ -p_193 ∨ break
c  in DIMACS:
 21812 -21813  21814 -193 1162 0


c  2-1 --> 1
c    (-b^{193, 1}_2 ∧  b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧ -p_193) -> (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0)
c  in CNF:
c     b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_2
c     b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_1
c     b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨  b^{193, 2}_0
c  in DIMACS:
 21812 -21813  21814  193 -21815 0
 21812 -21813  21814  193 -21816 0
 21812 -21813  21814  193  21817 0

c  1-1 --> 0
c    (-b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧  b^{193, 1}_0 ∧ -p_193) -> (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧ -b^{193, 2}_0)
c  in CNF:
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_2
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_1
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_0
c  in DIMACS:
 21812  21813 -21814  193 -21815 0
 21812  21813 -21814  193 -21816 0
 21812  21813 -21814  193 -21817 0

c  0-1 --> -1
c    (-b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧ -p_193) -> ( b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0)
c  in CNF:
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨  b^{193, 2}_2
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_1
c     b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨  b^{193, 2}_0
c  in DIMACS:
 21812  21813  21814  193  21815 0
 21812  21813  21814  193 -21816 0
 21812  21813  21814  193  21817 0

c  -1-1 --> -2
c    ( b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧  b^{193, 1}_0 ∧ -p_193) -> ( b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0)
c  in CNF:
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨  b^{193, 2}_2
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨  b^{193, 2}_1
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨  p_193 ∨ -b^{193, 2}_0
c  in DIMACS:
-21812  21813 -21814  193  21815 0
-21812  21813 -21814  193  21816 0
-21812  21813 -21814  193 -21817 0

c  -2-1 --> break 
c    ( b^{193, 1}_2 ∧  b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧ -p_193) -> break
c  in CNF:
c    -b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨  b^{193, 1}_0 ∨  p_193 ∨ break
c  in DIMACS:
-21812 -21813  21814  193 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 1}_2 ∧ -b^{193, 1}_1 ∧ -b^{193, 1}_0 ∧ true) 
c  in CNF:
c    -b^{193, 1}_2 ∨  b^{193, 1}_1 ∨  b^{193, 1}_0 ∨ false 
c  in DIMACS:
-21812  21813  21814  0

c  3 does not represent an automaton state.
c    -(-b^{193, 1}_2 ∧  b^{193, 1}_1 ∧  b^{193, 1}_0 ∧ true) 
c  in CNF:
c     b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ false 
c  in DIMACS:
 21812 -21813 -21814  0
c  -3 does not represent an automaton state.
c    -( b^{193, 1}_2 ∧  b^{193, 1}_1 ∧  b^{193, 1}_0 ∧ true) 
c  in CNF:
c    -b^{193, 1}_2 ∨ -b^{193, 1}_1 ∨ -b^{193, 1}_0 ∨ false 
c  in DIMACS:
-21812 -21813 -21814  0

c i = 2
c  -2+1 --> -1
c    ( b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧  p_386) -> ( b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0)
c  in CNF:
c    -b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨  b^{193, 3}_2
c    -b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_1
c    -b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨  b^{193, 3}_0
c  in DIMACS:
-21815 -21816  21817 -386  21818 0
-21815 -21816  21817 -386 -21819 0
-21815 -21816  21817 -386  21820 0

c  -1+1 --> 0
c    ( b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0 ∧  p_386) -> (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧ -b^{193, 3}_0)
c  in CNF:
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_2
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_1
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_0
c  in DIMACS:
-21815  21816 -21817 -386 -21818 0
-21815  21816 -21817 -386 -21819 0
-21815  21816 -21817 -386 -21820 0

c  0+1 --> 1
c    (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧  p_386) -> (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0)
c  in CNF:
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_2
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_1
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨  b^{193, 3}_0
c  in DIMACS:
 21815  21816  21817 -386 -21818 0
 21815  21816  21817 -386 -21819 0
 21815  21816  21817 -386  21820 0

c  1+1 --> 2
c    (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0 ∧  p_386) -> (-b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0)
c  in CNF:
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_2
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨  b^{193, 3}_1
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ -p_386 ∨ -b^{193, 3}_0
c  in DIMACS:
 21815  21816 -21817 -386 -21818 0
 21815  21816 -21817 -386  21819 0
 21815  21816 -21817 -386 -21820 0

c  2+1 --> break 
c    (-b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧  p_386) -> break
c  in CNF:
c     b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ -p_386 ∨ break
c  in DIMACS:
 21815 -21816  21817 -386 1162 0


c  2-1 --> 1
c    (-b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧ -p_386) -> (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0)
c  in CNF:
c     b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_2
c     b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_1
c     b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨  b^{193, 3}_0
c  in DIMACS:
 21815 -21816  21817  386 -21818 0
 21815 -21816  21817  386 -21819 0
 21815 -21816  21817  386  21820 0

c  1-1 --> 0
c    (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0 ∧ -p_386) -> (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧ -b^{193, 3}_0)
c  in CNF:
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_2
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_1
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_0
c  in DIMACS:
 21815  21816 -21817  386 -21818 0
 21815  21816 -21817  386 -21819 0
 21815  21816 -21817  386 -21820 0

c  0-1 --> -1
c    (-b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧ -p_386) -> ( b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0)
c  in CNF:
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨  b^{193, 3}_2
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_1
c     b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨  b^{193, 3}_0
c  in DIMACS:
 21815  21816  21817  386  21818 0
 21815  21816  21817  386 -21819 0
 21815  21816  21817  386  21820 0

c  -1-1 --> -2
c    ( b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧  b^{193, 2}_0 ∧ -p_386) -> ( b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0)
c  in CNF:
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨  b^{193, 3}_2
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨  b^{193, 3}_1
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨  p_386 ∨ -b^{193, 3}_0
c  in DIMACS:
-21815  21816 -21817  386  21818 0
-21815  21816 -21817  386  21819 0
-21815  21816 -21817  386 -21820 0

c  -2-1 --> break 
c    ( b^{193, 2}_2 ∧  b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧ -p_386) -> break
c  in CNF:
c    -b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨  b^{193, 2}_0 ∨  p_386 ∨ break
c  in DIMACS:
-21815 -21816  21817  386 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 2}_2 ∧ -b^{193, 2}_1 ∧ -b^{193, 2}_0 ∧ true) 
c  in CNF:
c    -b^{193, 2}_2 ∨  b^{193, 2}_1 ∨  b^{193, 2}_0 ∨ false 
c  in DIMACS:
-21815  21816  21817  0

c  3 does not represent an automaton state.
c    -(-b^{193, 2}_2 ∧  b^{193, 2}_1 ∧  b^{193, 2}_0 ∧ true) 
c  in CNF:
c     b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ false 
c  in DIMACS:
 21815 -21816 -21817  0
c  -3 does not represent an automaton state.
c    -( b^{193, 2}_2 ∧  b^{193, 2}_1 ∧  b^{193, 2}_0 ∧ true) 
c  in CNF:
c    -b^{193, 2}_2 ∨ -b^{193, 2}_1 ∨ -b^{193, 2}_0 ∨ false 
c  in DIMACS:
-21815 -21816 -21817  0

c i = 3
c  -2+1 --> -1
c    ( b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧  p_579) -> ( b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0)
c  in CNF:
c    -b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨  b^{193, 4}_2
c    -b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_1
c    -b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨  b^{193, 4}_0
c  in DIMACS:
-21818 -21819  21820 -579  21821 0
-21818 -21819  21820 -579 -21822 0
-21818 -21819  21820 -579  21823 0

c  -1+1 --> 0
c    ( b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0 ∧  p_579) -> (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧ -b^{193, 4}_0)
c  in CNF:
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_2
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_1
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_0
c  in DIMACS:
-21818  21819 -21820 -579 -21821 0
-21818  21819 -21820 -579 -21822 0
-21818  21819 -21820 -579 -21823 0

c  0+1 --> 1
c    (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧  p_579) -> (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0)
c  in CNF:
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_2
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_1
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨  b^{193, 4}_0
c  in DIMACS:
 21818  21819  21820 -579 -21821 0
 21818  21819  21820 -579 -21822 0
 21818  21819  21820 -579  21823 0

c  1+1 --> 2
c    (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0 ∧  p_579) -> (-b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0)
c  in CNF:
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_2
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨  b^{193, 4}_1
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ -p_579 ∨ -b^{193, 4}_0
c  in DIMACS:
 21818  21819 -21820 -579 -21821 0
 21818  21819 -21820 -579  21822 0
 21818  21819 -21820 -579 -21823 0

c  2+1 --> break 
c    (-b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧  p_579) -> break
c  in CNF:
c     b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ -p_579 ∨ break
c  in DIMACS:
 21818 -21819  21820 -579 1162 0


c  2-1 --> 1
c    (-b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧ -p_579) -> (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0)
c  in CNF:
c     b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_2
c     b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_1
c     b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨  b^{193, 4}_0
c  in DIMACS:
 21818 -21819  21820  579 -21821 0
 21818 -21819  21820  579 -21822 0
 21818 -21819  21820  579  21823 0

c  1-1 --> 0
c    (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0 ∧ -p_579) -> (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧ -b^{193, 4}_0)
c  in CNF:
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_2
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_1
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_0
c  in DIMACS:
 21818  21819 -21820  579 -21821 0
 21818  21819 -21820  579 -21822 0
 21818  21819 -21820  579 -21823 0

c  0-1 --> -1
c    (-b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧ -p_579) -> ( b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0)
c  in CNF:
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨  b^{193, 4}_2
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_1
c     b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨  b^{193, 4}_0
c  in DIMACS:
 21818  21819  21820  579  21821 0
 21818  21819  21820  579 -21822 0
 21818  21819  21820  579  21823 0

c  -1-1 --> -2
c    ( b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧  b^{193, 3}_0 ∧ -p_579) -> ( b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0)
c  in CNF:
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨  b^{193, 4}_2
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨  b^{193, 4}_1
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨  p_579 ∨ -b^{193, 4}_0
c  in DIMACS:
-21818  21819 -21820  579  21821 0
-21818  21819 -21820  579  21822 0
-21818  21819 -21820  579 -21823 0

c  -2-1 --> break 
c    ( b^{193, 3}_2 ∧  b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧ -p_579) -> break
c  in CNF:
c    -b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨  b^{193, 3}_0 ∨  p_579 ∨ break
c  in DIMACS:
-21818 -21819  21820  579 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 3}_2 ∧ -b^{193, 3}_1 ∧ -b^{193, 3}_0 ∧ true) 
c  in CNF:
c    -b^{193, 3}_2 ∨  b^{193, 3}_1 ∨  b^{193, 3}_0 ∨ false 
c  in DIMACS:
-21818  21819  21820  0

c  3 does not represent an automaton state.
c    -(-b^{193, 3}_2 ∧  b^{193, 3}_1 ∧  b^{193, 3}_0 ∧ true) 
c  in CNF:
c     b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ false 
c  in DIMACS:
 21818 -21819 -21820  0
c  -3 does not represent an automaton state.
c    -( b^{193, 3}_2 ∧  b^{193, 3}_1 ∧  b^{193, 3}_0 ∧ true) 
c  in CNF:
c    -b^{193, 3}_2 ∨ -b^{193, 3}_1 ∨ -b^{193, 3}_0 ∨ false 
c  in DIMACS:
-21818 -21819 -21820  0

c i = 4
c  -2+1 --> -1
c    ( b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧  p_772) -> ( b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0)
c  in CNF:
c    -b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨  b^{193, 5}_2
c    -b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_1
c    -b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨  b^{193, 5}_0
c  in DIMACS:
-21821 -21822  21823 -772  21824 0
-21821 -21822  21823 -772 -21825 0
-21821 -21822  21823 -772  21826 0

c  -1+1 --> 0
c    ( b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0 ∧  p_772) -> (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧ -b^{193, 5}_0)
c  in CNF:
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_2
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_1
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_0
c  in DIMACS:
-21821  21822 -21823 -772 -21824 0
-21821  21822 -21823 -772 -21825 0
-21821  21822 -21823 -772 -21826 0

c  0+1 --> 1
c    (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧  p_772) -> (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0)
c  in CNF:
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_2
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_1
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨  b^{193, 5}_0
c  in DIMACS:
 21821  21822  21823 -772 -21824 0
 21821  21822  21823 -772 -21825 0
 21821  21822  21823 -772  21826 0

c  1+1 --> 2
c    (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0 ∧  p_772) -> (-b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0)
c  in CNF:
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_2
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨  b^{193, 5}_1
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ -p_772 ∨ -b^{193, 5}_0
c  in DIMACS:
 21821  21822 -21823 -772 -21824 0
 21821  21822 -21823 -772  21825 0
 21821  21822 -21823 -772 -21826 0

c  2+1 --> break 
c    (-b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧  p_772) -> break
c  in CNF:
c     b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ -p_772 ∨ break
c  in DIMACS:
 21821 -21822  21823 -772 1162 0


c  2-1 --> 1
c    (-b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧ -p_772) -> (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0)
c  in CNF:
c     b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_2
c     b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_1
c     b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨  b^{193, 5}_0
c  in DIMACS:
 21821 -21822  21823  772 -21824 0
 21821 -21822  21823  772 -21825 0
 21821 -21822  21823  772  21826 0

c  1-1 --> 0
c    (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0 ∧ -p_772) -> (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧ -b^{193, 5}_0)
c  in CNF:
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_2
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_1
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_0
c  in DIMACS:
 21821  21822 -21823  772 -21824 0
 21821  21822 -21823  772 -21825 0
 21821  21822 -21823  772 -21826 0

c  0-1 --> -1
c    (-b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧ -p_772) -> ( b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0)
c  in CNF:
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨  b^{193, 5}_2
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_1
c     b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨  b^{193, 5}_0
c  in DIMACS:
 21821  21822  21823  772  21824 0
 21821  21822  21823  772 -21825 0
 21821  21822  21823  772  21826 0

c  -1-1 --> -2
c    ( b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧  b^{193, 4}_0 ∧ -p_772) -> ( b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0)
c  in CNF:
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨  b^{193, 5}_2
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨  b^{193, 5}_1
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨  p_772 ∨ -b^{193, 5}_0
c  in DIMACS:
-21821  21822 -21823  772  21824 0
-21821  21822 -21823  772  21825 0
-21821  21822 -21823  772 -21826 0

c  -2-1 --> break 
c    ( b^{193, 4}_2 ∧  b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧ -p_772) -> break
c  in CNF:
c    -b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨  b^{193, 4}_0 ∨  p_772 ∨ break
c  in DIMACS:
-21821 -21822  21823  772 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 4}_2 ∧ -b^{193, 4}_1 ∧ -b^{193, 4}_0 ∧ true) 
c  in CNF:
c    -b^{193, 4}_2 ∨  b^{193, 4}_1 ∨  b^{193, 4}_0 ∨ false 
c  in DIMACS:
-21821  21822  21823  0

c  3 does not represent an automaton state.
c    -(-b^{193, 4}_2 ∧  b^{193, 4}_1 ∧  b^{193, 4}_0 ∧ true) 
c  in CNF:
c     b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ false 
c  in DIMACS:
 21821 -21822 -21823  0
c  -3 does not represent an automaton state.
c    -( b^{193, 4}_2 ∧  b^{193, 4}_1 ∧  b^{193, 4}_0 ∧ true) 
c  in CNF:
c    -b^{193, 4}_2 ∨ -b^{193, 4}_1 ∨ -b^{193, 4}_0 ∨ false 
c  in DIMACS:
-21821 -21822 -21823  0

c i = 5
c  -2+1 --> -1
c    ( b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧  p_965) -> ( b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0)
c  in CNF:
c    -b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨  b^{193, 6}_2
c    -b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_1
c    -b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨  b^{193, 6}_0
c  in DIMACS:
-21824 -21825  21826 -965  21827 0
-21824 -21825  21826 -965 -21828 0
-21824 -21825  21826 -965  21829 0

c  -1+1 --> 0
c    ( b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0 ∧  p_965) -> (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧ -b^{193, 6}_0)
c  in CNF:
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_2
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_1
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_0
c  in DIMACS:
-21824  21825 -21826 -965 -21827 0
-21824  21825 -21826 -965 -21828 0
-21824  21825 -21826 -965 -21829 0

c  0+1 --> 1
c    (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧  p_965) -> (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0)
c  in CNF:
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_2
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_1
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨  b^{193, 6}_0
c  in DIMACS:
 21824  21825  21826 -965 -21827 0
 21824  21825  21826 -965 -21828 0
 21824  21825  21826 -965  21829 0

c  1+1 --> 2
c    (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0 ∧  p_965) -> (-b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0)
c  in CNF:
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_2
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨  b^{193, 6}_1
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ -p_965 ∨ -b^{193, 6}_0
c  in DIMACS:
 21824  21825 -21826 -965 -21827 0
 21824  21825 -21826 -965  21828 0
 21824  21825 -21826 -965 -21829 0

c  2+1 --> break 
c    (-b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧  p_965) -> break
c  in CNF:
c     b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ -p_965 ∨ break
c  in DIMACS:
 21824 -21825  21826 -965 1162 0


c  2-1 --> 1
c    (-b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧ -p_965) -> (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0)
c  in CNF:
c     b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_2
c     b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_1
c     b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨  b^{193, 6}_0
c  in DIMACS:
 21824 -21825  21826  965 -21827 0
 21824 -21825  21826  965 -21828 0
 21824 -21825  21826  965  21829 0

c  1-1 --> 0
c    (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0 ∧ -p_965) -> (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧ -b^{193, 6}_0)
c  in CNF:
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_2
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_1
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_0
c  in DIMACS:
 21824  21825 -21826  965 -21827 0
 21824  21825 -21826  965 -21828 0
 21824  21825 -21826  965 -21829 0

c  0-1 --> -1
c    (-b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧ -p_965) -> ( b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0)
c  in CNF:
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨  b^{193, 6}_2
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_1
c     b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨  b^{193, 6}_0
c  in DIMACS:
 21824  21825  21826  965  21827 0
 21824  21825  21826  965 -21828 0
 21824  21825  21826  965  21829 0

c  -1-1 --> -2
c    ( b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧  b^{193, 5}_0 ∧ -p_965) -> ( b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0)
c  in CNF:
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨  b^{193, 6}_2
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨  b^{193, 6}_1
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨  p_965 ∨ -b^{193, 6}_0
c  in DIMACS:
-21824  21825 -21826  965  21827 0
-21824  21825 -21826  965  21828 0
-21824  21825 -21826  965 -21829 0

c  -2-1 --> break 
c    ( b^{193, 5}_2 ∧  b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧ -p_965) -> break
c  in CNF:
c    -b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨  b^{193, 5}_0 ∨  p_965 ∨ break
c  in DIMACS:
-21824 -21825  21826  965 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 5}_2 ∧ -b^{193, 5}_1 ∧ -b^{193, 5}_0 ∧ true) 
c  in CNF:
c    -b^{193, 5}_2 ∨  b^{193, 5}_1 ∨  b^{193, 5}_0 ∨ false 
c  in DIMACS:
-21824  21825  21826  0

c  3 does not represent an automaton state.
c    -(-b^{193, 5}_2 ∧  b^{193, 5}_1 ∧  b^{193, 5}_0 ∧ true) 
c  in CNF:
c     b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ false 
c  in DIMACS:
 21824 -21825 -21826  0
c  -3 does not represent an automaton state.
c    -( b^{193, 5}_2 ∧  b^{193, 5}_1 ∧  b^{193, 5}_0 ∧ true) 
c  in CNF:
c    -b^{193, 5}_2 ∨ -b^{193, 5}_1 ∨ -b^{193, 5}_0 ∨ false 
c  in DIMACS:
-21824 -21825 -21826  0

c i = 6
c  -2+1 --> -1
c    ( b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧  p_1158) -> ( b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧  b^{193, 7}_0)
c  in CNF:
c    -b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨  b^{193, 7}_2
c    -b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_1
c    -b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨  b^{193, 7}_0
c  in DIMACS:
-21827 -21828  21829 -1158  21830 0
-21827 -21828  21829 -1158 -21831 0
-21827 -21828  21829 -1158  21832 0

c  -1+1 --> 0
c    ( b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0 ∧  p_1158) -> (-b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧ -b^{193, 7}_0)
c  in CNF:
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_2
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_1
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_0
c  in DIMACS:
-21827  21828 -21829 -1158 -21830 0
-21827  21828 -21829 -1158 -21831 0
-21827  21828 -21829 -1158 -21832 0

c  0+1 --> 1
c    (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧  p_1158) -> (-b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧  b^{193, 7}_0)
c  in CNF:
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_2
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_1
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨  b^{193, 7}_0
c  in DIMACS:
 21827  21828  21829 -1158 -21830 0
 21827  21828  21829 -1158 -21831 0
 21827  21828  21829 -1158  21832 0

c  1+1 --> 2
c    (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0 ∧  p_1158) -> (-b^{193, 7}_2 ∧  b^{193, 7}_1 ∧ -b^{193, 7}_0)
c  in CNF:
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_2
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨  b^{193, 7}_1
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ -p_1158 ∨ -b^{193, 7}_0
c  in DIMACS:
 21827  21828 -21829 -1158 -21830 0
 21827  21828 -21829 -1158  21831 0
 21827  21828 -21829 -1158 -21832 0

c  2+1 --> break 
c    (-b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 21827 -21828  21829 -1158 1162 0


c  2-1 --> 1
c    (-b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧ -p_1158) -> (-b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧  b^{193, 7}_0)
c  in CNF:
c     b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_2
c     b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_1
c     b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨  b^{193, 7}_0
c  in DIMACS:
 21827 -21828  21829  1158 -21830 0
 21827 -21828  21829  1158 -21831 0
 21827 -21828  21829  1158  21832 0

c  1-1 --> 0
c    (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0 ∧ -p_1158) -> (-b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧ -b^{193, 7}_0)
c  in CNF:
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_2
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_1
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_0
c  in DIMACS:
 21827  21828 -21829  1158 -21830 0
 21827  21828 -21829  1158 -21831 0
 21827  21828 -21829  1158 -21832 0

c  0-1 --> -1
c    (-b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧ -p_1158) -> ( b^{193, 7}_2 ∧ -b^{193, 7}_1 ∧  b^{193, 7}_0)
c  in CNF:
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨  b^{193, 7}_2
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_1
c     b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨  b^{193, 7}_0
c  in DIMACS:
 21827  21828  21829  1158  21830 0
 21827  21828  21829  1158 -21831 0
 21827  21828  21829  1158  21832 0

c  -1-1 --> -2
c    ( b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧  b^{193, 6}_0 ∧ -p_1158) -> ( b^{193, 7}_2 ∧  b^{193, 7}_1 ∧ -b^{193, 7}_0)
c  in CNF:
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨  b^{193, 7}_2
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨  b^{193, 7}_1
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨  p_1158 ∨ -b^{193, 7}_0
c  in DIMACS:
-21827  21828 -21829  1158  21830 0
-21827  21828 -21829  1158  21831 0
-21827  21828 -21829  1158 -21832 0

c  -2-1 --> break 
c    ( b^{193, 6}_2 ∧  b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨  b^{193, 6}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-21827 -21828  21829  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{193, 6}_2 ∧ -b^{193, 6}_1 ∧ -b^{193, 6}_0 ∧ true) 
c  in CNF:
c    -b^{193, 6}_2 ∨  b^{193, 6}_1 ∨  b^{193, 6}_0 ∨ false 
c  in DIMACS:
-21827  21828  21829  0

c  3 does not represent an automaton state.
c    -(-b^{193, 6}_2 ∧  b^{193, 6}_1 ∧  b^{193, 6}_0 ∧ true) 
c  in CNF:
c     b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ false 
c  in DIMACS:
 21827 -21828 -21829  0
c  -3 does not represent an automaton state.
c    -( b^{193, 6}_2 ∧  b^{193, 6}_1 ∧  b^{193, 6}_0 ∧ true) 
c  in CNF:
c    -b^{193, 6}_2 ∨ -b^{193, 6}_1 ∨ -b^{193, 6}_0 ∨ false 
c  in DIMACS:
-21827 -21828 -21829  0

c INIT for k = 194
c    -b^{194, 1}_2
c    -b^{194, 1}_1
c    -b^{194, 1}_0
c  in DIMACS:
-21833 0
-21834 0
-21835 0

c Transitions for k = 194
c i = 1
c  -2+1 --> -1
c    ( b^{194, 1}_2 ∧  b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧  p_194) -> ( b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0)
c  in CNF:
c    -b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨  b^{194, 2}_2
c    -b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_1
c    -b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨  b^{194, 2}_0
c  in DIMACS:
-21833 -21834  21835 -194  21836 0
-21833 -21834  21835 -194 -21837 0
-21833 -21834  21835 -194  21838 0

c  -1+1 --> 0
c    ( b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧  b^{194, 1}_0 ∧  p_194) -> (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧ -b^{194, 2}_0)
c  in CNF:
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_2
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_1
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_0
c  in DIMACS:
-21833  21834 -21835 -194 -21836 0
-21833  21834 -21835 -194 -21837 0
-21833  21834 -21835 -194 -21838 0

c  0+1 --> 1
c    (-b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧  p_194) -> (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0)
c  in CNF:
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_2
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_1
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨  b^{194, 2}_0
c  in DIMACS:
 21833  21834  21835 -194 -21836 0
 21833  21834  21835 -194 -21837 0
 21833  21834  21835 -194  21838 0

c  1+1 --> 2
c    (-b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧  b^{194, 1}_0 ∧  p_194) -> (-b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0)
c  in CNF:
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_2
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨  b^{194, 2}_1
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ -p_194 ∨ -b^{194, 2}_0
c  in DIMACS:
 21833  21834 -21835 -194 -21836 0
 21833  21834 -21835 -194  21837 0
 21833  21834 -21835 -194 -21838 0

c  2+1 --> break 
c    (-b^{194, 1}_2 ∧  b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧  p_194) -> break
c  in CNF:
c     b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ -p_194 ∨ break
c  in DIMACS:
 21833 -21834  21835 -194 1162 0


c  2-1 --> 1
c    (-b^{194, 1}_2 ∧  b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧ -p_194) -> (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0)
c  in CNF:
c     b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_2
c     b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_1
c     b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨  b^{194, 2}_0
c  in DIMACS:
 21833 -21834  21835  194 -21836 0
 21833 -21834  21835  194 -21837 0
 21833 -21834  21835  194  21838 0

c  1-1 --> 0
c    (-b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧  b^{194, 1}_0 ∧ -p_194) -> (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧ -b^{194, 2}_0)
c  in CNF:
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_2
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_1
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_0
c  in DIMACS:
 21833  21834 -21835  194 -21836 0
 21833  21834 -21835  194 -21837 0
 21833  21834 -21835  194 -21838 0

c  0-1 --> -1
c    (-b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧ -p_194) -> ( b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0)
c  in CNF:
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨  b^{194, 2}_2
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_1
c     b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨  b^{194, 2}_0
c  in DIMACS:
 21833  21834  21835  194  21836 0
 21833  21834  21835  194 -21837 0
 21833  21834  21835  194  21838 0

c  -1-1 --> -2
c    ( b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧  b^{194, 1}_0 ∧ -p_194) -> ( b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0)
c  in CNF:
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨  b^{194, 2}_2
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨  b^{194, 2}_1
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨  p_194 ∨ -b^{194, 2}_0
c  in DIMACS:
-21833  21834 -21835  194  21836 0
-21833  21834 -21835  194  21837 0
-21833  21834 -21835  194 -21838 0

c  -2-1 --> break 
c    ( b^{194, 1}_2 ∧  b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧ -p_194) -> break
c  in CNF:
c    -b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨  b^{194, 1}_0 ∨  p_194 ∨ break
c  in DIMACS:
-21833 -21834  21835  194 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{194, 1}_2 ∧ -b^{194, 1}_1 ∧ -b^{194, 1}_0 ∧ true) 
c  in CNF:
c    -b^{194, 1}_2 ∨  b^{194, 1}_1 ∨  b^{194, 1}_0 ∨ false 
c  in DIMACS:
-21833  21834  21835  0

c  3 does not represent an automaton state.
c    -(-b^{194, 1}_2 ∧  b^{194, 1}_1 ∧  b^{194, 1}_0 ∧ true) 
c  in CNF:
c     b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ false 
c  in DIMACS:
 21833 -21834 -21835  0
c  -3 does not represent an automaton state.
c    -( b^{194, 1}_2 ∧  b^{194, 1}_1 ∧  b^{194, 1}_0 ∧ true) 
c  in CNF:
c    -b^{194, 1}_2 ∨ -b^{194, 1}_1 ∨ -b^{194, 1}_0 ∨ false 
c  in DIMACS:
-21833 -21834 -21835  0

c i = 2
c  -2+1 --> -1
c    ( b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧  p_388) -> ( b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0)
c  in CNF:
c    -b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨  b^{194, 3}_2
c    -b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_1
c    -b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨  b^{194, 3}_0
c  in DIMACS:
-21836 -21837  21838 -388  21839 0
-21836 -21837  21838 -388 -21840 0
-21836 -21837  21838 -388  21841 0

c  -1+1 --> 0
c    ( b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0 ∧  p_388) -> (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧ -b^{194, 3}_0)
c  in CNF:
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_2
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_1
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_0
c  in DIMACS:
-21836  21837 -21838 -388 -21839 0
-21836  21837 -21838 -388 -21840 0
-21836  21837 -21838 -388 -21841 0

c  0+1 --> 1
c    (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧  p_388) -> (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0)
c  in CNF:
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_2
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_1
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨  b^{194, 3}_0
c  in DIMACS:
 21836  21837  21838 -388 -21839 0
 21836  21837  21838 -388 -21840 0
 21836  21837  21838 -388  21841 0

c  1+1 --> 2
c    (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0 ∧  p_388) -> (-b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0)
c  in CNF:
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_2
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨  b^{194, 3}_1
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ -p_388 ∨ -b^{194, 3}_0
c  in DIMACS:
 21836  21837 -21838 -388 -21839 0
 21836  21837 -21838 -388  21840 0
 21836  21837 -21838 -388 -21841 0

c  2+1 --> break 
c    (-b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧  p_388) -> break
c  in CNF:
c     b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ -p_388 ∨ break
c  in DIMACS:
 21836 -21837  21838 -388 1162 0


c  2-1 --> 1
c    (-b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧ -p_388) -> (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0)
c  in CNF:
c     b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_2
c     b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_1
c     b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨  b^{194, 3}_0
c  in DIMACS:
 21836 -21837  21838  388 -21839 0
 21836 -21837  21838  388 -21840 0
 21836 -21837  21838  388  21841 0

c  1-1 --> 0
c    (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0 ∧ -p_388) -> (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧ -b^{194, 3}_0)
c  in CNF:
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_2
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_1
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_0
c  in DIMACS:
 21836  21837 -21838  388 -21839 0
 21836  21837 -21838  388 -21840 0
 21836  21837 -21838  388 -21841 0

c  0-1 --> -1
c    (-b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧ -p_388) -> ( b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0)
c  in CNF:
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨  b^{194, 3}_2
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_1
c     b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨  b^{194, 3}_0
c  in DIMACS:
 21836  21837  21838  388  21839 0
 21836  21837  21838  388 -21840 0
 21836  21837  21838  388  21841 0

c  -1-1 --> -2
c    ( b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧  b^{194, 2}_0 ∧ -p_388) -> ( b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0)
c  in CNF:
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨  b^{194, 3}_2
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨  b^{194, 3}_1
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨  p_388 ∨ -b^{194, 3}_0
c  in DIMACS:
-21836  21837 -21838  388  21839 0
-21836  21837 -21838  388  21840 0
-21836  21837 -21838  388 -21841 0

c  -2-1 --> break 
c    ( b^{194, 2}_2 ∧  b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧ -p_388) -> break
c  in CNF:
c    -b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨  b^{194, 2}_0 ∨  p_388 ∨ break
c  in DIMACS:
-21836 -21837  21838  388 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{194, 2}_2 ∧ -b^{194, 2}_1 ∧ -b^{194, 2}_0 ∧ true) 
c  in CNF:
c    -b^{194, 2}_2 ∨  b^{194, 2}_1 ∨  b^{194, 2}_0 ∨ false 
c  in DIMACS:
-21836  21837  21838  0

c  3 does not represent an automaton state.
c    -(-b^{194, 2}_2 ∧  b^{194, 2}_1 ∧  b^{194, 2}_0 ∧ true) 
c  in CNF:
c     b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ false 
c  in DIMACS:
 21836 -21837 -21838  0
c  -3 does not represent an automaton state.
c    -( b^{194, 2}_2 ∧  b^{194, 2}_1 ∧  b^{194, 2}_0 ∧ true) 
c  in CNF:
c    -b^{194, 2}_2 ∨ -b^{194, 2}_1 ∨ -b^{194, 2}_0 ∨ false 
c  in DIMACS:
-21836 -21837 -21838  0

c i = 3
c  -2+1 --> -1
c    ( b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧  p_582) -> ( b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0)
c  in CNF:
c    -b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨  b^{194, 4}_2
c    -b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_1
c    -b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨  b^{194, 4}_0
c  in DIMACS:
-21839 -21840  21841 -582  21842 0
-21839 -21840  21841 -582 -21843 0
-21839 -21840  21841 -582  21844 0

c  -1+1 --> 0
c    ( b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0 ∧  p_582) -> (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧ -b^{194, 4}_0)
c  in CNF:
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_2
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_1
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_0
c  in DIMACS:
-21839  21840 -21841 -582 -21842 0
-21839  21840 -21841 -582 -21843 0
-21839  21840 -21841 -582 -21844 0

c  0+1 --> 1
c    (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧  p_582) -> (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0)
c  in CNF:
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_2
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_1
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨  b^{194, 4}_0
c  in DIMACS:
 21839  21840  21841 -582 -21842 0
 21839  21840  21841 -582 -21843 0
 21839  21840  21841 -582  21844 0

c  1+1 --> 2
c    (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0 ∧  p_582) -> (-b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0)
c  in CNF:
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_2
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨  b^{194, 4}_1
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ -p_582 ∨ -b^{194, 4}_0
c  in DIMACS:
 21839  21840 -21841 -582 -21842 0
 21839  21840 -21841 -582  21843 0
 21839  21840 -21841 -582 -21844 0

c  2+1 --> break 
c    (-b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧  p_582) -> break
c  in CNF:
c     b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 21839 -21840  21841 -582 1162 0


c  2-1 --> 1
c    (-b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧ -p_582) -> (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0)
c  in CNF:
c     b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_2
c     b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_1
c     b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨  b^{194, 4}_0
c  in DIMACS:
 21839 -21840  21841  582 -21842 0
 21839 -21840  21841  582 -21843 0
 21839 -21840  21841  582  21844 0

c  1-1 --> 0
c    (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0 ∧ -p_582) -> (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧ -b^{194, 4}_0)
c  in CNF:
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_2
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_1
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_0
c  in DIMACS:
 21839  21840 -21841  582 -21842 0
 21839  21840 -21841  582 -21843 0
 21839  21840 -21841  582 -21844 0

c  0-1 --> -1
c    (-b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧ -p_582) -> ( b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0)
c  in CNF:
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨  b^{194, 4}_2
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_1
c     b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨  b^{194, 4}_0
c  in DIMACS:
 21839  21840  21841  582  21842 0
 21839  21840  21841  582 -21843 0
 21839  21840  21841  582  21844 0

c  -1-1 --> -2
c    ( b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧  b^{194, 3}_0 ∧ -p_582) -> ( b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0)
c  in CNF:
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨  b^{194, 4}_2
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨  b^{194, 4}_1
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨  p_582 ∨ -b^{194, 4}_0
c  in DIMACS:
-21839  21840 -21841  582  21842 0
-21839  21840 -21841  582  21843 0
-21839  21840 -21841  582 -21844 0

c  -2-1 --> break 
c    ( b^{194, 3}_2 ∧  b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨  b^{194, 3}_0 ∨  p_582 ∨ break
c  in DIMACS:
-21839 -21840  21841  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{194, 3}_2 ∧ -b^{194, 3}_1 ∧ -b^{194, 3}_0 ∧ true) 
c  in CNF:
c    -b^{194, 3}_2 ∨  b^{194, 3}_1 ∨  b^{194, 3}_0 ∨ false 
c  in DIMACS:
-21839  21840  21841  0

c  3 does not represent an automaton state.
c    -(-b^{194, 3}_2 ∧  b^{194, 3}_1 ∧  b^{194, 3}_0 ∧ true) 
c  in CNF:
c     b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ false 
c  in DIMACS:
 21839 -21840 -21841  0
c  -3 does not represent an automaton state.
c    -( b^{194, 3}_2 ∧  b^{194, 3}_1 ∧  b^{194, 3}_0 ∧ true) 
c  in CNF:
c    -b^{194, 3}_2 ∨ -b^{194, 3}_1 ∨ -b^{194, 3}_0 ∨ false 
c  in DIMACS:
-21839 -21840 -21841  0

c i = 4
c  -2+1 --> -1
c    ( b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧  p_776) -> ( b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0)
c  in CNF:
c    -b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨  b^{194, 5}_2
c    -b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_1
c    -b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨  b^{194, 5}_0
c  in DIMACS:
-21842 -21843  21844 -776  21845 0
-21842 -21843  21844 -776 -21846 0
-21842 -21843  21844 -776  21847 0

c  -1+1 --> 0
c    ( b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0 ∧  p_776) -> (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧ -b^{194, 5}_0)
c  in CNF:
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_2
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_1
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_0
c  in DIMACS:
-21842  21843 -21844 -776 -21845 0
-21842  21843 -21844 -776 -21846 0
-21842  21843 -21844 -776 -21847 0

c  0+1 --> 1
c    (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧  p_776) -> (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0)
c  in CNF:
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_2
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_1
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨  b^{194, 5}_0
c  in DIMACS:
 21842  21843  21844 -776 -21845 0
 21842  21843  21844 -776 -21846 0
 21842  21843  21844 -776  21847 0

c  1+1 --> 2
c    (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0 ∧  p_776) -> (-b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0)
c  in CNF:
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_2
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨  b^{194, 5}_1
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ -p_776 ∨ -b^{194, 5}_0
c  in DIMACS:
 21842  21843 -21844 -776 -21845 0
 21842  21843 -21844 -776  21846 0
 21842  21843 -21844 -776 -21847 0

c  2+1 --> break 
c    (-b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧  p_776) -> break
c  in CNF:
c     b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ -p_776 ∨ break
c  in DIMACS:
 21842 -21843  21844 -776 1162 0


c  2-1 --> 1
c    (-b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧ -p_776) -> (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0)
c  in CNF:
c     b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_2
c     b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_1
c     b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨  b^{194, 5}_0
c  in DIMACS:
 21842 -21843  21844  776 -21845 0
 21842 -21843  21844  776 -21846 0
 21842 -21843  21844  776  21847 0

c  1-1 --> 0
c    (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0 ∧ -p_776) -> (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧ -b^{194, 5}_0)
c  in CNF:
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_2
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_1
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_0
c  in DIMACS:
 21842  21843 -21844  776 -21845 0
 21842  21843 -21844  776 -21846 0
 21842  21843 -21844  776 -21847 0

c  0-1 --> -1
c    (-b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧ -p_776) -> ( b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0)
c  in CNF:
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨  b^{194, 5}_2
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_1
c     b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨  b^{194, 5}_0
c  in DIMACS:
 21842  21843  21844  776  21845 0
 21842  21843  21844  776 -21846 0
 21842  21843  21844  776  21847 0

c  -1-1 --> -2
c    ( b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧  b^{194, 4}_0 ∧ -p_776) -> ( b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0)
c  in CNF:
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨  b^{194, 5}_2
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨  b^{194, 5}_1
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨  p_776 ∨ -b^{194, 5}_0
c  in DIMACS:
-21842  21843 -21844  776  21845 0
-21842  21843 -21844  776  21846 0
-21842  21843 -21844  776 -21847 0

c  -2-1 --> break 
c    ( b^{194, 4}_2 ∧  b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧ -p_776) -> break
c  in CNF:
c    -b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨  b^{194, 4}_0 ∨  p_776 ∨ break
c  in DIMACS:
-21842 -21843  21844  776 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{194, 4}_2 ∧ -b^{194, 4}_1 ∧ -b^{194, 4}_0 ∧ true) 
c  in CNF:
c    -b^{194, 4}_2 ∨  b^{194, 4}_1 ∨  b^{194, 4}_0 ∨ false 
c  in DIMACS:
-21842  21843  21844  0

c  3 does not represent an automaton state.
c    -(-b^{194, 4}_2 ∧  b^{194, 4}_1 ∧  b^{194, 4}_0 ∧ true) 
c  in CNF:
c     b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ false 
c  in DIMACS:
 21842 -21843 -21844  0
c  -3 does not represent an automaton state.
c    -( b^{194, 4}_2 ∧  b^{194, 4}_1 ∧  b^{194, 4}_0 ∧ true) 
c  in CNF:
c    -b^{194, 4}_2 ∨ -b^{194, 4}_1 ∨ -b^{194, 4}_0 ∨ false 
c  in DIMACS:
-21842 -21843 -21844  0

c i = 5
c  -2+1 --> -1
c    ( b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧  p_970) -> ( b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧  b^{194, 6}_0)
c  in CNF:
c    -b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨  b^{194, 6}_2
c    -b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_1
c    -b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨  b^{194, 6}_0
c  in DIMACS:
-21845 -21846  21847 -970  21848 0
-21845 -21846  21847 -970 -21849 0
-21845 -21846  21847 -970  21850 0

c  -1+1 --> 0
c    ( b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0 ∧  p_970) -> (-b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧ -b^{194, 6}_0)
c  in CNF:
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_2
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_1
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_0
c  in DIMACS:
-21845  21846 -21847 -970 -21848 0
-21845  21846 -21847 -970 -21849 0
-21845  21846 -21847 -970 -21850 0

c  0+1 --> 1
c    (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧  p_970) -> (-b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧  b^{194, 6}_0)
c  in CNF:
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_2
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_1
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨  b^{194, 6}_0
c  in DIMACS:
 21845  21846  21847 -970 -21848 0
 21845  21846  21847 -970 -21849 0
 21845  21846  21847 -970  21850 0

c  1+1 --> 2
c    (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0 ∧  p_970) -> (-b^{194, 6}_2 ∧  b^{194, 6}_1 ∧ -b^{194, 6}_0)
c  in CNF:
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_2
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨  b^{194, 6}_1
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ -p_970 ∨ -b^{194, 6}_0
c  in DIMACS:
 21845  21846 -21847 -970 -21848 0
 21845  21846 -21847 -970  21849 0
 21845  21846 -21847 -970 -21850 0

c  2+1 --> break 
c    (-b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧  p_970) -> break
c  in CNF:
c     b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ -p_970 ∨ break
c  in DIMACS:
 21845 -21846  21847 -970 1162 0


c  2-1 --> 1
c    (-b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧ -p_970) -> (-b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧  b^{194, 6}_0)
c  in CNF:
c     b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_2
c     b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_1
c     b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨  b^{194, 6}_0
c  in DIMACS:
 21845 -21846  21847  970 -21848 0
 21845 -21846  21847  970 -21849 0
 21845 -21846  21847  970  21850 0

c  1-1 --> 0
c    (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0 ∧ -p_970) -> (-b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧ -b^{194, 6}_0)
c  in CNF:
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_2
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_1
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_0
c  in DIMACS:
 21845  21846 -21847  970 -21848 0
 21845  21846 -21847  970 -21849 0
 21845  21846 -21847  970 -21850 0

c  0-1 --> -1
c    (-b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧ -p_970) -> ( b^{194, 6}_2 ∧ -b^{194, 6}_1 ∧  b^{194, 6}_0)
c  in CNF:
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨  b^{194, 6}_2
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_1
c     b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨  b^{194, 6}_0
c  in DIMACS:
 21845  21846  21847  970  21848 0
 21845  21846  21847  970 -21849 0
 21845  21846  21847  970  21850 0

c  -1-1 --> -2
c    ( b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧  b^{194, 5}_0 ∧ -p_970) -> ( b^{194, 6}_2 ∧  b^{194, 6}_1 ∧ -b^{194, 6}_0)
c  in CNF:
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨  b^{194, 6}_2
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨  b^{194, 6}_1
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨  p_970 ∨ -b^{194, 6}_0
c  in DIMACS:
-21845  21846 -21847  970  21848 0
-21845  21846 -21847  970  21849 0
-21845  21846 -21847  970 -21850 0

c  -2-1 --> break 
c    ( b^{194, 5}_2 ∧  b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧ -p_970) -> break
c  in CNF:
c    -b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨  b^{194, 5}_0 ∨  p_970 ∨ break
c  in DIMACS:
-21845 -21846  21847  970 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{194, 5}_2 ∧ -b^{194, 5}_1 ∧ -b^{194, 5}_0 ∧ true) 
c  in CNF:
c    -b^{194, 5}_2 ∨  b^{194, 5}_1 ∨  b^{194, 5}_0 ∨ false 
c  in DIMACS:
-21845  21846  21847  0

c  3 does not represent an automaton state.
c    -(-b^{194, 5}_2 ∧  b^{194, 5}_1 ∧  b^{194, 5}_0 ∧ true) 
c  in CNF:
c     b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ false 
c  in DIMACS:
 21845 -21846 -21847  0
c  -3 does not represent an automaton state.
c    -( b^{194, 5}_2 ∧  b^{194, 5}_1 ∧  b^{194, 5}_0 ∧ true) 
c  in CNF:
c    -b^{194, 5}_2 ∨ -b^{194, 5}_1 ∨ -b^{194, 5}_0 ∨ false 
c  in DIMACS:
-21845 -21846 -21847  0

c INIT for k = 195
c    -b^{195, 1}_2
c    -b^{195, 1}_1
c    -b^{195, 1}_0
c  in DIMACS:
-21851 0
-21852 0
-21853 0

c Transitions for k = 195
c i = 1
c  -2+1 --> -1
c    ( b^{195, 1}_2 ∧  b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧  p_195) -> ( b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0)
c  in CNF:
c    -b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨  b^{195, 2}_2
c    -b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_1
c    -b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨  b^{195, 2}_0
c  in DIMACS:
-21851 -21852  21853 -195  21854 0
-21851 -21852  21853 -195 -21855 0
-21851 -21852  21853 -195  21856 0

c  -1+1 --> 0
c    ( b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧  b^{195, 1}_0 ∧  p_195) -> (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧ -b^{195, 2}_0)
c  in CNF:
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_2
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_1
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_0
c  in DIMACS:
-21851  21852 -21853 -195 -21854 0
-21851  21852 -21853 -195 -21855 0
-21851  21852 -21853 -195 -21856 0

c  0+1 --> 1
c    (-b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧  p_195) -> (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0)
c  in CNF:
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_2
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_1
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨  b^{195, 2}_0
c  in DIMACS:
 21851  21852  21853 -195 -21854 0
 21851  21852  21853 -195 -21855 0
 21851  21852  21853 -195  21856 0

c  1+1 --> 2
c    (-b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧  b^{195, 1}_0 ∧  p_195) -> (-b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0)
c  in CNF:
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_2
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨  b^{195, 2}_1
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ -p_195 ∨ -b^{195, 2}_0
c  in DIMACS:
 21851  21852 -21853 -195 -21854 0
 21851  21852 -21853 -195  21855 0
 21851  21852 -21853 -195 -21856 0

c  2+1 --> break 
c    (-b^{195, 1}_2 ∧  b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧  p_195) -> break
c  in CNF:
c     b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ -p_195 ∨ break
c  in DIMACS:
 21851 -21852  21853 -195 1162 0


c  2-1 --> 1
c    (-b^{195, 1}_2 ∧  b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧ -p_195) -> (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0)
c  in CNF:
c     b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_2
c     b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_1
c     b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨  b^{195, 2}_0
c  in DIMACS:
 21851 -21852  21853  195 -21854 0
 21851 -21852  21853  195 -21855 0
 21851 -21852  21853  195  21856 0

c  1-1 --> 0
c    (-b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧  b^{195, 1}_0 ∧ -p_195) -> (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧ -b^{195, 2}_0)
c  in CNF:
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_2
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_1
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_0
c  in DIMACS:
 21851  21852 -21853  195 -21854 0
 21851  21852 -21853  195 -21855 0
 21851  21852 -21853  195 -21856 0

c  0-1 --> -1
c    (-b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧ -p_195) -> ( b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0)
c  in CNF:
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨  b^{195, 2}_2
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_1
c     b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨  b^{195, 2}_0
c  in DIMACS:
 21851  21852  21853  195  21854 0
 21851  21852  21853  195 -21855 0
 21851  21852  21853  195  21856 0

c  -1-1 --> -2
c    ( b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧  b^{195, 1}_0 ∧ -p_195) -> ( b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0)
c  in CNF:
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨  b^{195, 2}_2
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨  b^{195, 2}_1
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨  p_195 ∨ -b^{195, 2}_0
c  in DIMACS:
-21851  21852 -21853  195  21854 0
-21851  21852 -21853  195  21855 0
-21851  21852 -21853  195 -21856 0

c  -2-1 --> break 
c    ( b^{195, 1}_2 ∧  b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧ -p_195) -> break
c  in CNF:
c    -b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨  b^{195, 1}_0 ∨  p_195 ∨ break
c  in DIMACS:
-21851 -21852  21853  195 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{195, 1}_2 ∧ -b^{195, 1}_1 ∧ -b^{195, 1}_0 ∧ true) 
c  in CNF:
c    -b^{195, 1}_2 ∨  b^{195, 1}_1 ∨  b^{195, 1}_0 ∨ false 
c  in DIMACS:
-21851  21852  21853  0

c  3 does not represent an automaton state.
c    -(-b^{195, 1}_2 ∧  b^{195, 1}_1 ∧  b^{195, 1}_0 ∧ true) 
c  in CNF:
c     b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ false 
c  in DIMACS:
 21851 -21852 -21853  0
c  -3 does not represent an automaton state.
c    -( b^{195, 1}_2 ∧  b^{195, 1}_1 ∧  b^{195, 1}_0 ∧ true) 
c  in CNF:
c    -b^{195, 1}_2 ∨ -b^{195, 1}_1 ∨ -b^{195, 1}_0 ∨ false 
c  in DIMACS:
-21851 -21852 -21853  0

c i = 2
c  -2+1 --> -1
c    ( b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧  p_390) -> ( b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0)
c  in CNF:
c    -b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨  b^{195, 3}_2
c    -b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_1
c    -b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨  b^{195, 3}_0
c  in DIMACS:
-21854 -21855  21856 -390  21857 0
-21854 -21855  21856 -390 -21858 0
-21854 -21855  21856 -390  21859 0

c  -1+1 --> 0
c    ( b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0 ∧  p_390) -> (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧ -b^{195, 3}_0)
c  in CNF:
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_2
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_1
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_0
c  in DIMACS:
-21854  21855 -21856 -390 -21857 0
-21854  21855 -21856 -390 -21858 0
-21854  21855 -21856 -390 -21859 0

c  0+1 --> 1
c    (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧  p_390) -> (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0)
c  in CNF:
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_2
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_1
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨  b^{195, 3}_0
c  in DIMACS:
 21854  21855  21856 -390 -21857 0
 21854  21855  21856 -390 -21858 0
 21854  21855  21856 -390  21859 0

c  1+1 --> 2
c    (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0 ∧  p_390) -> (-b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0)
c  in CNF:
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_2
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨  b^{195, 3}_1
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ -p_390 ∨ -b^{195, 3}_0
c  in DIMACS:
 21854  21855 -21856 -390 -21857 0
 21854  21855 -21856 -390  21858 0
 21854  21855 -21856 -390 -21859 0

c  2+1 --> break 
c    (-b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧  p_390) -> break
c  in CNF:
c     b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ -p_390 ∨ break
c  in DIMACS:
 21854 -21855  21856 -390 1162 0


c  2-1 --> 1
c    (-b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧ -p_390) -> (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0)
c  in CNF:
c     b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_2
c     b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_1
c     b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨  b^{195, 3}_0
c  in DIMACS:
 21854 -21855  21856  390 -21857 0
 21854 -21855  21856  390 -21858 0
 21854 -21855  21856  390  21859 0

c  1-1 --> 0
c    (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0 ∧ -p_390) -> (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧ -b^{195, 3}_0)
c  in CNF:
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_2
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_1
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_0
c  in DIMACS:
 21854  21855 -21856  390 -21857 0
 21854  21855 -21856  390 -21858 0
 21854  21855 -21856  390 -21859 0

c  0-1 --> -1
c    (-b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧ -p_390) -> ( b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0)
c  in CNF:
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨  b^{195, 3}_2
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_1
c     b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨  b^{195, 3}_0
c  in DIMACS:
 21854  21855  21856  390  21857 0
 21854  21855  21856  390 -21858 0
 21854  21855  21856  390  21859 0

c  -1-1 --> -2
c    ( b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧  b^{195, 2}_0 ∧ -p_390) -> ( b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0)
c  in CNF:
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨  b^{195, 3}_2
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨  b^{195, 3}_1
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨  p_390 ∨ -b^{195, 3}_0
c  in DIMACS:
-21854  21855 -21856  390  21857 0
-21854  21855 -21856  390  21858 0
-21854  21855 -21856  390 -21859 0

c  -2-1 --> break 
c    ( b^{195, 2}_2 ∧  b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧ -p_390) -> break
c  in CNF:
c    -b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨  b^{195, 2}_0 ∨  p_390 ∨ break
c  in DIMACS:
-21854 -21855  21856  390 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{195, 2}_2 ∧ -b^{195, 2}_1 ∧ -b^{195, 2}_0 ∧ true) 
c  in CNF:
c    -b^{195, 2}_2 ∨  b^{195, 2}_1 ∨  b^{195, 2}_0 ∨ false 
c  in DIMACS:
-21854  21855  21856  0

c  3 does not represent an automaton state.
c    -(-b^{195, 2}_2 ∧  b^{195, 2}_1 ∧  b^{195, 2}_0 ∧ true) 
c  in CNF:
c     b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ false 
c  in DIMACS:
 21854 -21855 -21856  0
c  -3 does not represent an automaton state.
c    -( b^{195, 2}_2 ∧  b^{195, 2}_1 ∧  b^{195, 2}_0 ∧ true) 
c  in CNF:
c    -b^{195, 2}_2 ∨ -b^{195, 2}_1 ∨ -b^{195, 2}_0 ∨ false 
c  in DIMACS:
-21854 -21855 -21856  0

c i = 3
c  -2+1 --> -1
c    ( b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧  p_585) -> ( b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0)
c  in CNF:
c    -b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨  b^{195, 4}_2
c    -b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_1
c    -b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨  b^{195, 4}_0
c  in DIMACS:
-21857 -21858  21859 -585  21860 0
-21857 -21858  21859 -585 -21861 0
-21857 -21858  21859 -585  21862 0

c  -1+1 --> 0
c    ( b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0 ∧  p_585) -> (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧ -b^{195, 4}_0)
c  in CNF:
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_2
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_1
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_0
c  in DIMACS:
-21857  21858 -21859 -585 -21860 0
-21857  21858 -21859 -585 -21861 0
-21857  21858 -21859 -585 -21862 0

c  0+1 --> 1
c    (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧  p_585) -> (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0)
c  in CNF:
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_2
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_1
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨  b^{195, 4}_0
c  in DIMACS:
 21857  21858  21859 -585 -21860 0
 21857  21858  21859 -585 -21861 0
 21857  21858  21859 -585  21862 0

c  1+1 --> 2
c    (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0 ∧  p_585) -> (-b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0)
c  in CNF:
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_2
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨  b^{195, 4}_1
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ -p_585 ∨ -b^{195, 4}_0
c  in DIMACS:
 21857  21858 -21859 -585 -21860 0
 21857  21858 -21859 -585  21861 0
 21857  21858 -21859 -585 -21862 0

c  2+1 --> break 
c    (-b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧  p_585) -> break
c  in CNF:
c     b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ -p_585 ∨ break
c  in DIMACS:
 21857 -21858  21859 -585 1162 0


c  2-1 --> 1
c    (-b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧ -p_585) -> (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0)
c  in CNF:
c     b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_2
c     b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_1
c     b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨  b^{195, 4}_0
c  in DIMACS:
 21857 -21858  21859  585 -21860 0
 21857 -21858  21859  585 -21861 0
 21857 -21858  21859  585  21862 0

c  1-1 --> 0
c    (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0 ∧ -p_585) -> (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧ -b^{195, 4}_0)
c  in CNF:
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_2
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_1
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_0
c  in DIMACS:
 21857  21858 -21859  585 -21860 0
 21857  21858 -21859  585 -21861 0
 21857  21858 -21859  585 -21862 0

c  0-1 --> -1
c    (-b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧ -p_585) -> ( b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0)
c  in CNF:
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨  b^{195, 4}_2
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_1
c     b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨  b^{195, 4}_0
c  in DIMACS:
 21857  21858  21859  585  21860 0
 21857  21858  21859  585 -21861 0
 21857  21858  21859  585  21862 0

c  -1-1 --> -2
c    ( b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧  b^{195, 3}_0 ∧ -p_585) -> ( b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0)
c  in CNF:
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨  b^{195, 4}_2
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨  b^{195, 4}_1
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨  p_585 ∨ -b^{195, 4}_0
c  in DIMACS:
-21857  21858 -21859  585  21860 0
-21857  21858 -21859  585  21861 0
-21857  21858 -21859  585 -21862 0

c  -2-1 --> break 
c    ( b^{195, 3}_2 ∧  b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧ -p_585) -> break
c  in CNF:
c    -b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨  b^{195, 3}_0 ∨  p_585 ∨ break
c  in DIMACS:
-21857 -21858  21859  585 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{195, 3}_2 ∧ -b^{195, 3}_1 ∧ -b^{195, 3}_0 ∧ true) 
c  in CNF:
c    -b^{195, 3}_2 ∨  b^{195, 3}_1 ∨  b^{195, 3}_0 ∨ false 
c  in DIMACS:
-21857  21858  21859  0

c  3 does not represent an automaton state.
c    -(-b^{195, 3}_2 ∧  b^{195, 3}_1 ∧  b^{195, 3}_0 ∧ true) 
c  in CNF:
c     b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ false 
c  in DIMACS:
 21857 -21858 -21859  0
c  -3 does not represent an automaton state.
c    -( b^{195, 3}_2 ∧  b^{195, 3}_1 ∧  b^{195, 3}_0 ∧ true) 
c  in CNF:
c    -b^{195, 3}_2 ∨ -b^{195, 3}_1 ∨ -b^{195, 3}_0 ∨ false 
c  in DIMACS:
-21857 -21858 -21859  0

c i = 4
c  -2+1 --> -1
c    ( b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧  p_780) -> ( b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0)
c  in CNF:
c    -b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨  b^{195, 5}_2
c    -b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_1
c    -b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨  b^{195, 5}_0
c  in DIMACS:
-21860 -21861  21862 -780  21863 0
-21860 -21861  21862 -780 -21864 0
-21860 -21861  21862 -780  21865 0

c  -1+1 --> 0
c    ( b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0 ∧  p_780) -> (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧ -b^{195, 5}_0)
c  in CNF:
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_2
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_1
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_0
c  in DIMACS:
-21860  21861 -21862 -780 -21863 0
-21860  21861 -21862 -780 -21864 0
-21860  21861 -21862 -780 -21865 0

c  0+1 --> 1
c    (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧  p_780) -> (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0)
c  in CNF:
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_2
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_1
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨  b^{195, 5}_0
c  in DIMACS:
 21860  21861  21862 -780 -21863 0
 21860  21861  21862 -780 -21864 0
 21860  21861  21862 -780  21865 0

c  1+1 --> 2
c    (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0 ∧  p_780) -> (-b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0)
c  in CNF:
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_2
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨  b^{195, 5}_1
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ -p_780 ∨ -b^{195, 5}_0
c  in DIMACS:
 21860  21861 -21862 -780 -21863 0
 21860  21861 -21862 -780  21864 0
 21860  21861 -21862 -780 -21865 0

c  2+1 --> break 
c    (-b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧  p_780) -> break
c  in CNF:
c     b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 21860 -21861  21862 -780 1162 0


c  2-1 --> 1
c    (-b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧ -p_780) -> (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0)
c  in CNF:
c     b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_2
c     b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_1
c     b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨  b^{195, 5}_0
c  in DIMACS:
 21860 -21861  21862  780 -21863 0
 21860 -21861  21862  780 -21864 0
 21860 -21861  21862  780  21865 0

c  1-1 --> 0
c    (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0 ∧ -p_780) -> (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧ -b^{195, 5}_0)
c  in CNF:
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_2
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_1
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_0
c  in DIMACS:
 21860  21861 -21862  780 -21863 0
 21860  21861 -21862  780 -21864 0
 21860  21861 -21862  780 -21865 0

c  0-1 --> -1
c    (-b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧ -p_780) -> ( b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0)
c  in CNF:
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨  b^{195, 5}_2
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_1
c     b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨  b^{195, 5}_0
c  in DIMACS:
 21860  21861  21862  780  21863 0
 21860  21861  21862  780 -21864 0
 21860  21861  21862  780  21865 0

c  -1-1 --> -2
c    ( b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧  b^{195, 4}_0 ∧ -p_780) -> ( b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0)
c  in CNF:
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨  b^{195, 5}_2
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨  b^{195, 5}_1
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨  p_780 ∨ -b^{195, 5}_0
c  in DIMACS:
-21860  21861 -21862  780  21863 0
-21860  21861 -21862  780  21864 0
-21860  21861 -21862  780 -21865 0

c  -2-1 --> break 
c    ( b^{195, 4}_2 ∧  b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨  b^{195, 4}_0 ∨  p_780 ∨ break
c  in DIMACS:
-21860 -21861  21862  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{195, 4}_2 ∧ -b^{195, 4}_1 ∧ -b^{195, 4}_0 ∧ true) 
c  in CNF:
c    -b^{195, 4}_2 ∨  b^{195, 4}_1 ∨  b^{195, 4}_0 ∨ false 
c  in DIMACS:
-21860  21861  21862  0

c  3 does not represent an automaton state.
c    -(-b^{195, 4}_2 ∧  b^{195, 4}_1 ∧  b^{195, 4}_0 ∧ true) 
c  in CNF:
c     b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ false 
c  in DIMACS:
 21860 -21861 -21862  0
c  -3 does not represent an automaton state.
c    -( b^{195, 4}_2 ∧  b^{195, 4}_1 ∧  b^{195, 4}_0 ∧ true) 
c  in CNF:
c    -b^{195, 4}_2 ∨ -b^{195, 4}_1 ∨ -b^{195, 4}_0 ∨ false 
c  in DIMACS:
-21860 -21861 -21862  0

c i = 5
c  -2+1 --> -1
c    ( b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧  p_975) -> ( b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧  b^{195, 6}_0)
c  in CNF:
c    -b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨  b^{195, 6}_2
c    -b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_1
c    -b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨  b^{195, 6}_0
c  in DIMACS:
-21863 -21864  21865 -975  21866 0
-21863 -21864  21865 -975 -21867 0
-21863 -21864  21865 -975  21868 0

c  -1+1 --> 0
c    ( b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0 ∧  p_975) -> (-b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧ -b^{195, 6}_0)
c  in CNF:
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_2
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_1
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_0
c  in DIMACS:
-21863  21864 -21865 -975 -21866 0
-21863  21864 -21865 -975 -21867 0
-21863  21864 -21865 -975 -21868 0

c  0+1 --> 1
c    (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧  p_975) -> (-b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧  b^{195, 6}_0)
c  in CNF:
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_2
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_1
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨  b^{195, 6}_0
c  in DIMACS:
 21863  21864  21865 -975 -21866 0
 21863  21864  21865 -975 -21867 0
 21863  21864  21865 -975  21868 0

c  1+1 --> 2
c    (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0 ∧  p_975) -> (-b^{195, 6}_2 ∧  b^{195, 6}_1 ∧ -b^{195, 6}_0)
c  in CNF:
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_2
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨  b^{195, 6}_1
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ -p_975 ∨ -b^{195, 6}_0
c  in DIMACS:
 21863  21864 -21865 -975 -21866 0
 21863  21864 -21865 -975  21867 0
 21863  21864 -21865 -975 -21868 0

c  2+1 --> break 
c    (-b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧  p_975) -> break
c  in CNF:
c     b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 21863 -21864  21865 -975 1162 0


c  2-1 --> 1
c    (-b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧ -p_975) -> (-b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧  b^{195, 6}_0)
c  in CNF:
c     b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_2
c     b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_1
c     b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨  b^{195, 6}_0
c  in DIMACS:
 21863 -21864  21865  975 -21866 0
 21863 -21864  21865  975 -21867 0
 21863 -21864  21865  975  21868 0

c  1-1 --> 0
c    (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0 ∧ -p_975) -> (-b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧ -b^{195, 6}_0)
c  in CNF:
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_2
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_1
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_0
c  in DIMACS:
 21863  21864 -21865  975 -21866 0
 21863  21864 -21865  975 -21867 0
 21863  21864 -21865  975 -21868 0

c  0-1 --> -1
c    (-b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧ -p_975) -> ( b^{195, 6}_2 ∧ -b^{195, 6}_1 ∧  b^{195, 6}_0)
c  in CNF:
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨  b^{195, 6}_2
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_1
c     b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨  b^{195, 6}_0
c  in DIMACS:
 21863  21864  21865  975  21866 0
 21863  21864  21865  975 -21867 0
 21863  21864  21865  975  21868 0

c  -1-1 --> -2
c    ( b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧  b^{195, 5}_0 ∧ -p_975) -> ( b^{195, 6}_2 ∧  b^{195, 6}_1 ∧ -b^{195, 6}_0)
c  in CNF:
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨  b^{195, 6}_2
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨  b^{195, 6}_1
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨  p_975 ∨ -b^{195, 6}_0
c  in DIMACS:
-21863  21864 -21865  975  21866 0
-21863  21864 -21865  975  21867 0
-21863  21864 -21865  975 -21868 0

c  -2-1 --> break 
c    ( b^{195, 5}_2 ∧  b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨  b^{195, 5}_0 ∨  p_975 ∨ break
c  in DIMACS:
-21863 -21864  21865  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{195, 5}_2 ∧ -b^{195, 5}_1 ∧ -b^{195, 5}_0 ∧ true) 
c  in CNF:
c    -b^{195, 5}_2 ∨  b^{195, 5}_1 ∨  b^{195, 5}_0 ∨ false 
c  in DIMACS:
-21863  21864  21865  0

c  3 does not represent an automaton state.
c    -(-b^{195, 5}_2 ∧  b^{195, 5}_1 ∧  b^{195, 5}_0 ∧ true) 
c  in CNF:
c     b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ false 
c  in DIMACS:
 21863 -21864 -21865  0
c  -3 does not represent an automaton state.
c    -( b^{195, 5}_2 ∧  b^{195, 5}_1 ∧  b^{195, 5}_0 ∧ true) 
c  in CNF:
c    -b^{195, 5}_2 ∨ -b^{195, 5}_1 ∨ -b^{195, 5}_0 ∨ false 
c  in DIMACS:
-21863 -21864 -21865  0

c INIT for k = 196
c    -b^{196, 1}_2
c    -b^{196, 1}_1
c    -b^{196, 1}_0
c  in DIMACS:
-21869 0
-21870 0
-21871 0

c Transitions for k = 196
c i = 1
c  -2+1 --> -1
c    ( b^{196, 1}_2 ∧  b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧  p_196) -> ( b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0)
c  in CNF:
c    -b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨  b^{196, 2}_2
c    -b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_1
c    -b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨  b^{196, 2}_0
c  in DIMACS:
-21869 -21870  21871 -196  21872 0
-21869 -21870  21871 -196 -21873 0
-21869 -21870  21871 -196  21874 0

c  -1+1 --> 0
c    ( b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧  b^{196, 1}_0 ∧  p_196) -> (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧ -b^{196, 2}_0)
c  in CNF:
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_2
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_1
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_0
c  in DIMACS:
-21869  21870 -21871 -196 -21872 0
-21869  21870 -21871 -196 -21873 0
-21869  21870 -21871 -196 -21874 0

c  0+1 --> 1
c    (-b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧  p_196) -> (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0)
c  in CNF:
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_2
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_1
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨  b^{196, 2}_0
c  in DIMACS:
 21869  21870  21871 -196 -21872 0
 21869  21870  21871 -196 -21873 0
 21869  21870  21871 -196  21874 0

c  1+1 --> 2
c    (-b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧  b^{196, 1}_0 ∧  p_196) -> (-b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0)
c  in CNF:
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_2
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨  b^{196, 2}_1
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ -p_196 ∨ -b^{196, 2}_0
c  in DIMACS:
 21869  21870 -21871 -196 -21872 0
 21869  21870 -21871 -196  21873 0
 21869  21870 -21871 -196 -21874 0

c  2+1 --> break 
c    (-b^{196, 1}_2 ∧  b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧  p_196) -> break
c  in CNF:
c     b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ -p_196 ∨ break
c  in DIMACS:
 21869 -21870  21871 -196 1162 0


c  2-1 --> 1
c    (-b^{196, 1}_2 ∧  b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧ -p_196) -> (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0)
c  in CNF:
c     b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_2
c     b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_1
c     b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨  b^{196, 2}_0
c  in DIMACS:
 21869 -21870  21871  196 -21872 0
 21869 -21870  21871  196 -21873 0
 21869 -21870  21871  196  21874 0

c  1-1 --> 0
c    (-b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧  b^{196, 1}_0 ∧ -p_196) -> (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧ -b^{196, 2}_0)
c  in CNF:
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_2
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_1
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_0
c  in DIMACS:
 21869  21870 -21871  196 -21872 0
 21869  21870 -21871  196 -21873 0
 21869  21870 -21871  196 -21874 0

c  0-1 --> -1
c    (-b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧ -p_196) -> ( b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0)
c  in CNF:
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨  b^{196, 2}_2
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_1
c     b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨  b^{196, 2}_0
c  in DIMACS:
 21869  21870  21871  196  21872 0
 21869  21870  21871  196 -21873 0
 21869  21870  21871  196  21874 0

c  -1-1 --> -2
c    ( b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧  b^{196, 1}_0 ∧ -p_196) -> ( b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0)
c  in CNF:
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨  b^{196, 2}_2
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨  b^{196, 2}_1
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨  p_196 ∨ -b^{196, 2}_0
c  in DIMACS:
-21869  21870 -21871  196  21872 0
-21869  21870 -21871  196  21873 0
-21869  21870 -21871  196 -21874 0

c  -2-1 --> break 
c    ( b^{196, 1}_2 ∧  b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧ -p_196) -> break
c  in CNF:
c    -b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨  b^{196, 1}_0 ∨  p_196 ∨ break
c  in DIMACS:
-21869 -21870  21871  196 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{196, 1}_2 ∧ -b^{196, 1}_1 ∧ -b^{196, 1}_0 ∧ true) 
c  in CNF:
c    -b^{196, 1}_2 ∨  b^{196, 1}_1 ∨  b^{196, 1}_0 ∨ false 
c  in DIMACS:
-21869  21870  21871  0

c  3 does not represent an automaton state.
c    -(-b^{196, 1}_2 ∧  b^{196, 1}_1 ∧  b^{196, 1}_0 ∧ true) 
c  in CNF:
c     b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ false 
c  in DIMACS:
 21869 -21870 -21871  0
c  -3 does not represent an automaton state.
c    -( b^{196, 1}_2 ∧  b^{196, 1}_1 ∧  b^{196, 1}_0 ∧ true) 
c  in CNF:
c    -b^{196, 1}_2 ∨ -b^{196, 1}_1 ∨ -b^{196, 1}_0 ∨ false 
c  in DIMACS:
-21869 -21870 -21871  0

c i = 2
c  -2+1 --> -1
c    ( b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧  p_392) -> ( b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0)
c  in CNF:
c    -b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨  b^{196, 3}_2
c    -b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_1
c    -b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨  b^{196, 3}_0
c  in DIMACS:
-21872 -21873  21874 -392  21875 0
-21872 -21873  21874 -392 -21876 0
-21872 -21873  21874 -392  21877 0

c  -1+1 --> 0
c    ( b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0 ∧  p_392) -> (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧ -b^{196, 3}_0)
c  in CNF:
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_2
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_1
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_0
c  in DIMACS:
-21872  21873 -21874 -392 -21875 0
-21872  21873 -21874 -392 -21876 0
-21872  21873 -21874 -392 -21877 0

c  0+1 --> 1
c    (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧  p_392) -> (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0)
c  in CNF:
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_2
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_1
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨  b^{196, 3}_0
c  in DIMACS:
 21872  21873  21874 -392 -21875 0
 21872  21873  21874 -392 -21876 0
 21872  21873  21874 -392  21877 0

c  1+1 --> 2
c    (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0 ∧  p_392) -> (-b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0)
c  in CNF:
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_2
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨  b^{196, 3}_1
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ -p_392 ∨ -b^{196, 3}_0
c  in DIMACS:
 21872  21873 -21874 -392 -21875 0
 21872  21873 -21874 -392  21876 0
 21872  21873 -21874 -392 -21877 0

c  2+1 --> break 
c    (-b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧  p_392) -> break
c  in CNF:
c     b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ -p_392 ∨ break
c  in DIMACS:
 21872 -21873  21874 -392 1162 0


c  2-1 --> 1
c    (-b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧ -p_392) -> (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0)
c  in CNF:
c     b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_2
c     b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_1
c     b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨  b^{196, 3}_0
c  in DIMACS:
 21872 -21873  21874  392 -21875 0
 21872 -21873  21874  392 -21876 0
 21872 -21873  21874  392  21877 0

c  1-1 --> 0
c    (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0 ∧ -p_392) -> (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧ -b^{196, 3}_0)
c  in CNF:
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_2
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_1
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_0
c  in DIMACS:
 21872  21873 -21874  392 -21875 0
 21872  21873 -21874  392 -21876 0
 21872  21873 -21874  392 -21877 0

c  0-1 --> -1
c    (-b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧ -p_392) -> ( b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0)
c  in CNF:
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨  b^{196, 3}_2
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_1
c     b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨  b^{196, 3}_0
c  in DIMACS:
 21872  21873  21874  392  21875 0
 21872  21873  21874  392 -21876 0
 21872  21873  21874  392  21877 0

c  -1-1 --> -2
c    ( b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧  b^{196, 2}_0 ∧ -p_392) -> ( b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0)
c  in CNF:
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨  b^{196, 3}_2
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨  b^{196, 3}_1
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨  p_392 ∨ -b^{196, 3}_0
c  in DIMACS:
-21872  21873 -21874  392  21875 0
-21872  21873 -21874  392  21876 0
-21872  21873 -21874  392 -21877 0

c  -2-1 --> break 
c    ( b^{196, 2}_2 ∧  b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧ -p_392) -> break
c  in CNF:
c    -b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨  b^{196, 2}_0 ∨  p_392 ∨ break
c  in DIMACS:
-21872 -21873  21874  392 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{196, 2}_2 ∧ -b^{196, 2}_1 ∧ -b^{196, 2}_0 ∧ true) 
c  in CNF:
c    -b^{196, 2}_2 ∨  b^{196, 2}_1 ∨  b^{196, 2}_0 ∨ false 
c  in DIMACS:
-21872  21873  21874  0

c  3 does not represent an automaton state.
c    -(-b^{196, 2}_2 ∧  b^{196, 2}_1 ∧  b^{196, 2}_0 ∧ true) 
c  in CNF:
c     b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ false 
c  in DIMACS:
 21872 -21873 -21874  0
c  -3 does not represent an automaton state.
c    -( b^{196, 2}_2 ∧  b^{196, 2}_1 ∧  b^{196, 2}_0 ∧ true) 
c  in CNF:
c    -b^{196, 2}_2 ∨ -b^{196, 2}_1 ∨ -b^{196, 2}_0 ∨ false 
c  in DIMACS:
-21872 -21873 -21874  0

c i = 3
c  -2+1 --> -1
c    ( b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧  p_588) -> ( b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0)
c  in CNF:
c    -b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨  b^{196, 4}_2
c    -b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_1
c    -b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨  b^{196, 4}_0
c  in DIMACS:
-21875 -21876  21877 -588  21878 0
-21875 -21876  21877 -588 -21879 0
-21875 -21876  21877 -588  21880 0

c  -1+1 --> 0
c    ( b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0 ∧  p_588) -> (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧ -b^{196, 4}_0)
c  in CNF:
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_2
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_1
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_0
c  in DIMACS:
-21875  21876 -21877 -588 -21878 0
-21875  21876 -21877 -588 -21879 0
-21875  21876 -21877 -588 -21880 0

c  0+1 --> 1
c    (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧  p_588) -> (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0)
c  in CNF:
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_2
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_1
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨  b^{196, 4}_0
c  in DIMACS:
 21875  21876  21877 -588 -21878 0
 21875  21876  21877 -588 -21879 0
 21875  21876  21877 -588  21880 0

c  1+1 --> 2
c    (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0 ∧  p_588) -> (-b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0)
c  in CNF:
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_2
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨  b^{196, 4}_1
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ -p_588 ∨ -b^{196, 4}_0
c  in DIMACS:
 21875  21876 -21877 -588 -21878 0
 21875  21876 -21877 -588  21879 0
 21875  21876 -21877 -588 -21880 0

c  2+1 --> break 
c    (-b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧  p_588) -> break
c  in CNF:
c     b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 21875 -21876  21877 -588 1162 0


c  2-1 --> 1
c    (-b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧ -p_588) -> (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0)
c  in CNF:
c     b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_2
c     b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_1
c     b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨  b^{196, 4}_0
c  in DIMACS:
 21875 -21876  21877  588 -21878 0
 21875 -21876  21877  588 -21879 0
 21875 -21876  21877  588  21880 0

c  1-1 --> 0
c    (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0 ∧ -p_588) -> (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧ -b^{196, 4}_0)
c  in CNF:
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_2
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_1
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_0
c  in DIMACS:
 21875  21876 -21877  588 -21878 0
 21875  21876 -21877  588 -21879 0
 21875  21876 -21877  588 -21880 0

c  0-1 --> -1
c    (-b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧ -p_588) -> ( b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0)
c  in CNF:
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨  b^{196, 4}_2
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_1
c     b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨  b^{196, 4}_0
c  in DIMACS:
 21875  21876  21877  588  21878 0
 21875  21876  21877  588 -21879 0
 21875  21876  21877  588  21880 0

c  -1-1 --> -2
c    ( b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧  b^{196, 3}_0 ∧ -p_588) -> ( b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0)
c  in CNF:
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨  b^{196, 4}_2
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨  b^{196, 4}_1
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨  p_588 ∨ -b^{196, 4}_0
c  in DIMACS:
-21875  21876 -21877  588  21878 0
-21875  21876 -21877  588  21879 0
-21875  21876 -21877  588 -21880 0

c  -2-1 --> break 
c    ( b^{196, 3}_2 ∧  b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨  b^{196, 3}_0 ∨  p_588 ∨ break
c  in DIMACS:
-21875 -21876  21877  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{196, 3}_2 ∧ -b^{196, 3}_1 ∧ -b^{196, 3}_0 ∧ true) 
c  in CNF:
c    -b^{196, 3}_2 ∨  b^{196, 3}_1 ∨  b^{196, 3}_0 ∨ false 
c  in DIMACS:
-21875  21876  21877  0

c  3 does not represent an automaton state.
c    -(-b^{196, 3}_2 ∧  b^{196, 3}_1 ∧  b^{196, 3}_0 ∧ true) 
c  in CNF:
c     b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ false 
c  in DIMACS:
 21875 -21876 -21877  0
c  -3 does not represent an automaton state.
c    -( b^{196, 3}_2 ∧  b^{196, 3}_1 ∧  b^{196, 3}_0 ∧ true) 
c  in CNF:
c    -b^{196, 3}_2 ∨ -b^{196, 3}_1 ∨ -b^{196, 3}_0 ∨ false 
c  in DIMACS:
-21875 -21876 -21877  0

c i = 4
c  -2+1 --> -1
c    ( b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧  p_784) -> ( b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0)
c  in CNF:
c    -b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨  b^{196, 5}_2
c    -b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_1
c    -b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨  b^{196, 5}_0
c  in DIMACS:
-21878 -21879  21880 -784  21881 0
-21878 -21879  21880 -784 -21882 0
-21878 -21879  21880 -784  21883 0

c  -1+1 --> 0
c    ( b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0 ∧  p_784) -> (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧ -b^{196, 5}_0)
c  in CNF:
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_2
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_1
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_0
c  in DIMACS:
-21878  21879 -21880 -784 -21881 0
-21878  21879 -21880 -784 -21882 0
-21878  21879 -21880 -784 -21883 0

c  0+1 --> 1
c    (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧  p_784) -> (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0)
c  in CNF:
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_2
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_1
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨  b^{196, 5}_0
c  in DIMACS:
 21878  21879  21880 -784 -21881 0
 21878  21879  21880 -784 -21882 0
 21878  21879  21880 -784  21883 0

c  1+1 --> 2
c    (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0 ∧  p_784) -> (-b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0)
c  in CNF:
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_2
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨  b^{196, 5}_1
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ -p_784 ∨ -b^{196, 5}_0
c  in DIMACS:
 21878  21879 -21880 -784 -21881 0
 21878  21879 -21880 -784  21882 0
 21878  21879 -21880 -784 -21883 0

c  2+1 --> break 
c    (-b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧  p_784) -> break
c  in CNF:
c     b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ -p_784 ∨ break
c  in DIMACS:
 21878 -21879  21880 -784 1162 0


c  2-1 --> 1
c    (-b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧ -p_784) -> (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0)
c  in CNF:
c     b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_2
c     b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_1
c     b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨  b^{196, 5}_0
c  in DIMACS:
 21878 -21879  21880  784 -21881 0
 21878 -21879  21880  784 -21882 0
 21878 -21879  21880  784  21883 0

c  1-1 --> 0
c    (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0 ∧ -p_784) -> (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧ -b^{196, 5}_0)
c  in CNF:
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_2
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_1
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_0
c  in DIMACS:
 21878  21879 -21880  784 -21881 0
 21878  21879 -21880  784 -21882 0
 21878  21879 -21880  784 -21883 0

c  0-1 --> -1
c    (-b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧ -p_784) -> ( b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0)
c  in CNF:
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨  b^{196, 5}_2
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_1
c     b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨  b^{196, 5}_0
c  in DIMACS:
 21878  21879  21880  784  21881 0
 21878  21879  21880  784 -21882 0
 21878  21879  21880  784  21883 0

c  -1-1 --> -2
c    ( b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧  b^{196, 4}_0 ∧ -p_784) -> ( b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0)
c  in CNF:
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨  b^{196, 5}_2
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨  b^{196, 5}_1
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨  p_784 ∨ -b^{196, 5}_0
c  in DIMACS:
-21878  21879 -21880  784  21881 0
-21878  21879 -21880  784  21882 0
-21878  21879 -21880  784 -21883 0

c  -2-1 --> break 
c    ( b^{196, 4}_2 ∧  b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧ -p_784) -> break
c  in CNF:
c    -b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨  b^{196, 4}_0 ∨  p_784 ∨ break
c  in DIMACS:
-21878 -21879  21880  784 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{196, 4}_2 ∧ -b^{196, 4}_1 ∧ -b^{196, 4}_0 ∧ true) 
c  in CNF:
c    -b^{196, 4}_2 ∨  b^{196, 4}_1 ∨  b^{196, 4}_0 ∨ false 
c  in DIMACS:
-21878  21879  21880  0

c  3 does not represent an automaton state.
c    -(-b^{196, 4}_2 ∧  b^{196, 4}_1 ∧  b^{196, 4}_0 ∧ true) 
c  in CNF:
c     b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ false 
c  in DIMACS:
 21878 -21879 -21880  0
c  -3 does not represent an automaton state.
c    -( b^{196, 4}_2 ∧  b^{196, 4}_1 ∧  b^{196, 4}_0 ∧ true) 
c  in CNF:
c    -b^{196, 4}_2 ∨ -b^{196, 4}_1 ∨ -b^{196, 4}_0 ∨ false 
c  in DIMACS:
-21878 -21879 -21880  0

c i = 5
c  -2+1 --> -1
c    ( b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧  p_980) -> ( b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧  b^{196, 6}_0)
c  in CNF:
c    -b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨  b^{196, 6}_2
c    -b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_1
c    -b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨  b^{196, 6}_0
c  in DIMACS:
-21881 -21882  21883 -980  21884 0
-21881 -21882  21883 -980 -21885 0
-21881 -21882  21883 -980  21886 0

c  -1+1 --> 0
c    ( b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0 ∧  p_980) -> (-b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧ -b^{196, 6}_0)
c  in CNF:
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_2
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_1
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_0
c  in DIMACS:
-21881  21882 -21883 -980 -21884 0
-21881  21882 -21883 -980 -21885 0
-21881  21882 -21883 -980 -21886 0

c  0+1 --> 1
c    (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧  p_980) -> (-b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧  b^{196, 6}_0)
c  in CNF:
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_2
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_1
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨  b^{196, 6}_0
c  in DIMACS:
 21881  21882  21883 -980 -21884 0
 21881  21882  21883 -980 -21885 0
 21881  21882  21883 -980  21886 0

c  1+1 --> 2
c    (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0 ∧  p_980) -> (-b^{196, 6}_2 ∧  b^{196, 6}_1 ∧ -b^{196, 6}_0)
c  in CNF:
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_2
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨  b^{196, 6}_1
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ -p_980 ∨ -b^{196, 6}_0
c  in DIMACS:
 21881  21882 -21883 -980 -21884 0
 21881  21882 -21883 -980  21885 0
 21881  21882 -21883 -980 -21886 0

c  2+1 --> break 
c    (-b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧  p_980) -> break
c  in CNF:
c     b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 21881 -21882  21883 -980 1162 0


c  2-1 --> 1
c    (-b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧ -p_980) -> (-b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧  b^{196, 6}_0)
c  in CNF:
c     b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_2
c     b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_1
c     b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨  b^{196, 6}_0
c  in DIMACS:
 21881 -21882  21883  980 -21884 0
 21881 -21882  21883  980 -21885 0
 21881 -21882  21883  980  21886 0

c  1-1 --> 0
c    (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0 ∧ -p_980) -> (-b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧ -b^{196, 6}_0)
c  in CNF:
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_2
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_1
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_0
c  in DIMACS:
 21881  21882 -21883  980 -21884 0
 21881  21882 -21883  980 -21885 0
 21881  21882 -21883  980 -21886 0

c  0-1 --> -1
c    (-b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧ -p_980) -> ( b^{196, 6}_2 ∧ -b^{196, 6}_1 ∧  b^{196, 6}_0)
c  in CNF:
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨  b^{196, 6}_2
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_1
c     b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨  b^{196, 6}_0
c  in DIMACS:
 21881  21882  21883  980  21884 0
 21881  21882  21883  980 -21885 0
 21881  21882  21883  980  21886 0

c  -1-1 --> -2
c    ( b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧  b^{196, 5}_0 ∧ -p_980) -> ( b^{196, 6}_2 ∧  b^{196, 6}_1 ∧ -b^{196, 6}_0)
c  in CNF:
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨  b^{196, 6}_2
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨  b^{196, 6}_1
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨  p_980 ∨ -b^{196, 6}_0
c  in DIMACS:
-21881  21882 -21883  980  21884 0
-21881  21882 -21883  980  21885 0
-21881  21882 -21883  980 -21886 0

c  -2-1 --> break 
c    ( b^{196, 5}_2 ∧  b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨  b^{196, 5}_0 ∨  p_980 ∨ break
c  in DIMACS:
-21881 -21882  21883  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{196, 5}_2 ∧ -b^{196, 5}_1 ∧ -b^{196, 5}_0 ∧ true) 
c  in CNF:
c    -b^{196, 5}_2 ∨  b^{196, 5}_1 ∨  b^{196, 5}_0 ∨ false 
c  in DIMACS:
-21881  21882  21883  0

c  3 does not represent an automaton state.
c    -(-b^{196, 5}_2 ∧  b^{196, 5}_1 ∧  b^{196, 5}_0 ∧ true) 
c  in CNF:
c     b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ false 
c  in DIMACS:
 21881 -21882 -21883  0
c  -3 does not represent an automaton state.
c    -( b^{196, 5}_2 ∧  b^{196, 5}_1 ∧  b^{196, 5}_0 ∧ true) 
c  in CNF:
c    -b^{196, 5}_2 ∨ -b^{196, 5}_1 ∨ -b^{196, 5}_0 ∨ false 
c  in DIMACS:
-21881 -21882 -21883  0

c INIT for k = 197
c    -b^{197, 1}_2
c    -b^{197, 1}_1
c    -b^{197, 1}_0
c  in DIMACS:
-21887 0
-21888 0
-21889 0

c Transitions for k = 197
c i = 1
c  -2+1 --> -1
c    ( b^{197, 1}_2 ∧  b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧  p_197) -> ( b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0)
c  in CNF:
c    -b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨  b^{197, 2}_2
c    -b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_1
c    -b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨  b^{197, 2}_0
c  in DIMACS:
-21887 -21888  21889 -197  21890 0
-21887 -21888  21889 -197 -21891 0
-21887 -21888  21889 -197  21892 0

c  -1+1 --> 0
c    ( b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧  b^{197, 1}_0 ∧  p_197) -> (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧ -b^{197, 2}_0)
c  in CNF:
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_2
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_1
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_0
c  in DIMACS:
-21887  21888 -21889 -197 -21890 0
-21887  21888 -21889 -197 -21891 0
-21887  21888 -21889 -197 -21892 0

c  0+1 --> 1
c    (-b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧  p_197) -> (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0)
c  in CNF:
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_2
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_1
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨  b^{197, 2}_0
c  in DIMACS:
 21887  21888  21889 -197 -21890 0
 21887  21888  21889 -197 -21891 0
 21887  21888  21889 -197  21892 0

c  1+1 --> 2
c    (-b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧  b^{197, 1}_0 ∧  p_197) -> (-b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0)
c  in CNF:
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_2
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨  b^{197, 2}_1
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ -p_197 ∨ -b^{197, 2}_0
c  in DIMACS:
 21887  21888 -21889 -197 -21890 0
 21887  21888 -21889 -197  21891 0
 21887  21888 -21889 -197 -21892 0

c  2+1 --> break 
c    (-b^{197, 1}_2 ∧  b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧  p_197) -> break
c  in CNF:
c     b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ -p_197 ∨ break
c  in DIMACS:
 21887 -21888  21889 -197 1162 0


c  2-1 --> 1
c    (-b^{197, 1}_2 ∧  b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧ -p_197) -> (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0)
c  in CNF:
c     b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_2
c     b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_1
c     b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨  b^{197, 2}_0
c  in DIMACS:
 21887 -21888  21889  197 -21890 0
 21887 -21888  21889  197 -21891 0
 21887 -21888  21889  197  21892 0

c  1-1 --> 0
c    (-b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧  b^{197, 1}_0 ∧ -p_197) -> (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧ -b^{197, 2}_0)
c  in CNF:
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_2
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_1
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_0
c  in DIMACS:
 21887  21888 -21889  197 -21890 0
 21887  21888 -21889  197 -21891 0
 21887  21888 -21889  197 -21892 0

c  0-1 --> -1
c    (-b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧ -p_197) -> ( b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0)
c  in CNF:
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨  b^{197, 2}_2
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_1
c     b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨  b^{197, 2}_0
c  in DIMACS:
 21887  21888  21889  197  21890 0
 21887  21888  21889  197 -21891 0
 21887  21888  21889  197  21892 0

c  -1-1 --> -2
c    ( b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧  b^{197, 1}_0 ∧ -p_197) -> ( b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0)
c  in CNF:
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨  b^{197, 2}_2
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨  b^{197, 2}_1
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨  p_197 ∨ -b^{197, 2}_0
c  in DIMACS:
-21887  21888 -21889  197  21890 0
-21887  21888 -21889  197  21891 0
-21887  21888 -21889  197 -21892 0

c  -2-1 --> break 
c    ( b^{197, 1}_2 ∧  b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧ -p_197) -> break
c  in CNF:
c    -b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨  b^{197, 1}_0 ∨  p_197 ∨ break
c  in DIMACS:
-21887 -21888  21889  197 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{197, 1}_2 ∧ -b^{197, 1}_1 ∧ -b^{197, 1}_0 ∧ true) 
c  in CNF:
c    -b^{197, 1}_2 ∨  b^{197, 1}_1 ∨  b^{197, 1}_0 ∨ false 
c  in DIMACS:
-21887  21888  21889  0

c  3 does not represent an automaton state.
c    -(-b^{197, 1}_2 ∧  b^{197, 1}_1 ∧  b^{197, 1}_0 ∧ true) 
c  in CNF:
c     b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ false 
c  in DIMACS:
 21887 -21888 -21889  0
c  -3 does not represent an automaton state.
c    -( b^{197, 1}_2 ∧  b^{197, 1}_1 ∧  b^{197, 1}_0 ∧ true) 
c  in CNF:
c    -b^{197, 1}_2 ∨ -b^{197, 1}_1 ∨ -b^{197, 1}_0 ∨ false 
c  in DIMACS:
-21887 -21888 -21889  0

c i = 2
c  -2+1 --> -1
c    ( b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧  p_394) -> ( b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0)
c  in CNF:
c    -b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨  b^{197, 3}_2
c    -b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_1
c    -b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨  b^{197, 3}_0
c  in DIMACS:
-21890 -21891  21892 -394  21893 0
-21890 -21891  21892 -394 -21894 0
-21890 -21891  21892 -394  21895 0

c  -1+1 --> 0
c    ( b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0 ∧  p_394) -> (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧ -b^{197, 3}_0)
c  in CNF:
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_2
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_1
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_0
c  in DIMACS:
-21890  21891 -21892 -394 -21893 0
-21890  21891 -21892 -394 -21894 0
-21890  21891 -21892 -394 -21895 0

c  0+1 --> 1
c    (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧  p_394) -> (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0)
c  in CNF:
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_2
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_1
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨  b^{197, 3}_0
c  in DIMACS:
 21890  21891  21892 -394 -21893 0
 21890  21891  21892 -394 -21894 0
 21890  21891  21892 -394  21895 0

c  1+1 --> 2
c    (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0 ∧  p_394) -> (-b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0)
c  in CNF:
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_2
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨  b^{197, 3}_1
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ -p_394 ∨ -b^{197, 3}_0
c  in DIMACS:
 21890  21891 -21892 -394 -21893 0
 21890  21891 -21892 -394  21894 0
 21890  21891 -21892 -394 -21895 0

c  2+1 --> break 
c    (-b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧  p_394) -> break
c  in CNF:
c     b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ -p_394 ∨ break
c  in DIMACS:
 21890 -21891  21892 -394 1162 0


c  2-1 --> 1
c    (-b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧ -p_394) -> (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0)
c  in CNF:
c     b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_2
c     b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_1
c     b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨  b^{197, 3}_0
c  in DIMACS:
 21890 -21891  21892  394 -21893 0
 21890 -21891  21892  394 -21894 0
 21890 -21891  21892  394  21895 0

c  1-1 --> 0
c    (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0 ∧ -p_394) -> (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧ -b^{197, 3}_0)
c  in CNF:
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_2
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_1
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_0
c  in DIMACS:
 21890  21891 -21892  394 -21893 0
 21890  21891 -21892  394 -21894 0
 21890  21891 -21892  394 -21895 0

c  0-1 --> -1
c    (-b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧ -p_394) -> ( b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0)
c  in CNF:
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨  b^{197, 3}_2
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_1
c     b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨  b^{197, 3}_0
c  in DIMACS:
 21890  21891  21892  394  21893 0
 21890  21891  21892  394 -21894 0
 21890  21891  21892  394  21895 0

c  -1-1 --> -2
c    ( b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧  b^{197, 2}_0 ∧ -p_394) -> ( b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0)
c  in CNF:
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨  b^{197, 3}_2
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨  b^{197, 3}_1
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨  p_394 ∨ -b^{197, 3}_0
c  in DIMACS:
-21890  21891 -21892  394  21893 0
-21890  21891 -21892  394  21894 0
-21890  21891 -21892  394 -21895 0

c  -2-1 --> break 
c    ( b^{197, 2}_2 ∧  b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧ -p_394) -> break
c  in CNF:
c    -b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨  b^{197, 2}_0 ∨  p_394 ∨ break
c  in DIMACS:
-21890 -21891  21892  394 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{197, 2}_2 ∧ -b^{197, 2}_1 ∧ -b^{197, 2}_0 ∧ true) 
c  in CNF:
c    -b^{197, 2}_2 ∨  b^{197, 2}_1 ∨  b^{197, 2}_0 ∨ false 
c  in DIMACS:
-21890  21891  21892  0

c  3 does not represent an automaton state.
c    -(-b^{197, 2}_2 ∧  b^{197, 2}_1 ∧  b^{197, 2}_0 ∧ true) 
c  in CNF:
c     b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ false 
c  in DIMACS:
 21890 -21891 -21892  0
c  -3 does not represent an automaton state.
c    -( b^{197, 2}_2 ∧  b^{197, 2}_1 ∧  b^{197, 2}_0 ∧ true) 
c  in CNF:
c    -b^{197, 2}_2 ∨ -b^{197, 2}_1 ∨ -b^{197, 2}_0 ∨ false 
c  in DIMACS:
-21890 -21891 -21892  0

c i = 3
c  -2+1 --> -1
c    ( b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧  p_591) -> ( b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0)
c  in CNF:
c    -b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨  b^{197, 4}_2
c    -b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_1
c    -b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨  b^{197, 4}_0
c  in DIMACS:
-21893 -21894  21895 -591  21896 0
-21893 -21894  21895 -591 -21897 0
-21893 -21894  21895 -591  21898 0

c  -1+1 --> 0
c    ( b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0 ∧  p_591) -> (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧ -b^{197, 4}_0)
c  in CNF:
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_2
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_1
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_0
c  in DIMACS:
-21893  21894 -21895 -591 -21896 0
-21893  21894 -21895 -591 -21897 0
-21893  21894 -21895 -591 -21898 0

c  0+1 --> 1
c    (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧  p_591) -> (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0)
c  in CNF:
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_2
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_1
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨  b^{197, 4}_0
c  in DIMACS:
 21893  21894  21895 -591 -21896 0
 21893  21894  21895 -591 -21897 0
 21893  21894  21895 -591  21898 0

c  1+1 --> 2
c    (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0 ∧  p_591) -> (-b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0)
c  in CNF:
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_2
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨  b^{197, 4}_1
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ -p_591 ∨ -b^{197, 4}_0
c  in DIMACS:
 21893  21894 -21895 -591 -21896 0
 21893  21894 -21895 -591  21897 0
 21893  21894 -21895 -591 -21898 0

c  2+1 --> break 
c    (-b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧  p_591) -> break
c  in CNF:
c     b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ -p_591 ∨ break
c  in DIMACS:
 21893 -21894  21895 -591 1162 0


c  2-1 --> 1
c    (-b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧ -p_591) -> (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0)
c  in CNF:
c     b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_2
c     b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_1
c     b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨  b^{197, 4}_0
c  in DIMACS:
 21893 -21894  21895  591 -21896 0
 21893 -21894  21895  591 -21897 0
 21893 -21894  21895  591  21898 0

c  1-1 --> 0
c    (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0 ∧ -p_591) -> (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧ -b^{197, 4}_0)
c  in CNF:
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_2
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_1
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_0
c  in DIMACS:
 21893  21894 -21895  591 -21896 0
 21893  21894 -21895  591 -21897 0
 21893  21894 -21895  591 -21898 0

c  0-1 --> -1
c    (-b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧ -p_591) -> ( b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0)
c  in CNF:
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨  b^{197, 4}_2
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_1
c     b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨  b^{197, 4}_0
c  in DIMACS:
 21893  21894  21895  591  21896 0
 21893  21894  21895  591 -21897 0
 21893  21894  21895  591  21898 0

c  -1-1 --> -2
c    ( b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧  b^{197, 3}_0 ∧ -p_591) -> ( b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0)
c  in CNF:
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨  b^{197, 4}_2
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨  b^{197, 4}_1
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨  p_591 ∨ -b^{197, 4}_0
c  in DIMACS:
-21893  21894 -21895  591  21896 0
-21893  21894 -21895  591  21897 0
-21893  21894 -21895  591 -21898 0

c  -2-1 --> break 
c    ( b^{197, 3}_2 ∧  b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧ -p_591) -> break
c  in CNF:
c    -b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨  b^{197, 3}_0 ∨  p_591 ∨ break
c  in DIMACS:
-21893 -21894  21895  591 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{197, 3}_2 ∧ -b^{197, 3}_1 ∧ -b^{197, 3}_0 ∧ true) 
c  in CNF:
c    -b^{197, 3}_2 ∨  b^{197, 3}_1 ∨  b^{197, 3}_0 ∨ false 
c  in DIMACS:
-21893  21894  21895  0

c  3 does not represent an automaton state.
c    -(-b^{197, 3}_2 ∧  b^{197, 3}_1 ∧  b^{197, 3}_0 ∧ true) 
c  in CNF:
c     b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ false 
c  in DIMACS:
 21893 -21894 -21895  0
c  -3 does not represent an automaton state.
c    -( b^{197, 3}_2 ∧  b^{197, 3}_1 ∧  b^{197, 3}_0 ∧ true) 
c  in CNF:
c    -b^{197, 3}_2 ∨ -b^{197, 3}_1 ∨ -b^{197, 3}_0 ∨ false 
c  in DIMACS:
-21893 -21894 -21895  0

c i = 4
c  -2+1 --> -1
c    ( b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧  p_788) -> ( b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0)
c  in CNF:
c    -b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨  b^{197, 5}_2
c    -b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_1
c    -b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨  b^{197, 5}_0
c  in DIMACS:
-21896 -21897  21898 -788  21899 0
-21896 -21897  21898 -788 -21900 0
-21896 -21897  21898 -788  21901 0

c  -1+1 --> 0
c    ( b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0 ∧  p_788) -> (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧ -b^{197, 5}_0)
c  in CNF:
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_2
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_1
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_0
c  in DIMACS:
-21896  21897 -21898 -788 -21899 0
-21896  21897 -21898 -788 -21900 0
-21896  21897 -21898 -788 -21901 0

c  0+1 --> 1
c    (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧  p_788) -> (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0)
c  in CNF:
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_2
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_1
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨  b^{197, 5}_0
c  in DIMACS:
 21896  21897  21898 -788 -21899 0
 21896  21897  21898 -788 -21900 0
 21896  21897  21898 -788  21901 0

c  1+1 --> 2
c    (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0 ∧  p_788) -> (-b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0)
c  in CNF:
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_2
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨  b^{197, 5}_1
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ -p_788 ∨ -b^{197, 5}_0
c  in DIMACS:
 21896  21897 -21898 -788 -21899 0
 21896  21897 -21898 -788  21900 0
 21896  21897 -21898 -788 -21901 0

c  2+1 --> break 
c    (-b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧  p_788) -> break
c  in CNF:
c     b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ -p_788 ∨ break
c  in DIMACS:
 21896 -21897  21898 -788 1162 0


c  2-1 --> 1
c    (-b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧ -p_788) -> (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0)
c  in CNF:
c     b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_2
c     b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_1
c     b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨  b^{197, 5}_0
c  in DIMACS:
 21896 -21897  21898  788 -21899 0
 21896 -21897  21898  788 -21900 0
 21896 -21897  21898  788  21901 0

c  1-1 --> 0
c    (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0 ∧ -p_788) -> (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧ -b^{197, 5}_0)
c  in CNF:
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_2
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_1
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_0
c  in DIMACS:
 21896  21897 -21898  788 -21899 0
 21896  21897 -21898  788 -21900 0
 21896  21897 -21898  788 -21901 0

c  0-1 --> -1
c    (-b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧ -p_788) -> ( b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0)
c  in CNF:
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨  b^{197, 5}_2
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_1
c     b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨  b^{197, 5}_0
c  in DIMACS:
 21896  21897  21898  788  21899 0
 21896  21897  21898  788 -21900 0
 21896  21897  21898  788  21901 0

c  -1-1 --> -2
c    ( b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧  b^{197, 4}_0 ∧ -p_788) -> ( b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0)
c  in CNF:
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨  b^{197, 5}_2
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨  b^{197, 5}_1
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨  p_788 ∨ -b^{197, 5}_0
c  in DIMACS:
-21896  21897 -21898  788  21899 0
-21896  21897 -21898  788  21900 0
-21896  21897 -21898  788 -21901 0

c  -2-1 --> break 
c    ( b^{197, 4}_2 ∧  b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧ -p_788) -> break
c  in CNF:
c    -b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨  b^{197, 4}_0 ∨  p_788 ∨ break
c  in DIMACS:
-21896 -21897  21898  788 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{197, 4}_2 ∧ -b^{197, 4}_1 ∧ -b^{197, 4}_0 ∧ true) 
c  in CNF:
c    -b^{197, 4}_2 ∨  b^{197, 4}_1 ∨  b^{197, 4}_0 ∨ false 
c  in DIMACS:
-21896  21897  21898  0

c  3 does not represent an automaton state.
c    -(-b^{197, 4}_2 ∧  b^{197, 4}_1 ∧  b^{197, 4}_0 ∧ true) 
c  in CNF:
c     b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ false 
c  in DIMACS:
 21896 -21897 -21898  0
c  -3 does not represent an automaton state.
c    -( b^{197, 4}_2 ∧  b^{197, 4}_1 ∧  b^{197, 4}_0 ∧ true) 
c  in CNF:
c    -b^{197, 4}_2 ∨ -b^{197, 4}_1 ∨ -b^{197, 4}_0 ∨ false 
c  in DIMACS:
-21896 -21897 -21898  0

c i = 5
c  -2+1 --> -1
c    ( b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧  p_985) -> ( b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧  b^{197, 6}_0)
c  in CNF:
c    -b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨  b^{197, 6}_2
c    -b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_1
c    -b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨  b^{197, 6}_0
c  in DIMACS:
-21899 -21900  21901 -985  21902 0
-21899 -21900  21901 -985 -21903 0
-21899 -21900  21901 -985  21904 0

c  -1+1 --> 0
c    ( b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0 ∧  p_985) -> (-b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧ -b^{197, 6}_0)
c  in CNF:
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_2
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_1
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_0
c  in DIMACS:
-21899  21900 -21901 -985 -21902 0
-21899  21900 -21901 -985 -21903 0
-21899  21900 -21901 -985 -21904 0

c  0+1 --> 1
c    (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧  p_985) -> (-b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧  b^{197, 6}_0)
c  in CNF:
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_2
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_1
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨  b^{197, 6}_0
c  in DIMACS:
 21899  21900  21901 -985 -21902 0
 21899  21900  21901 -985 -21903 0
 21899  21900  21901 -985  21904 0

c  1+1 --> 2
c    (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0 ∧  p_985) -> (-b^{197, 6}_2 ∧  b^{197, 6}_1 ∧ -b^{197, 6}_0)
c  in CNF:
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_2
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨  b^{197, 6}_1
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ -p_985 ∨ -b^{197, 6}_0
c  in DIMACS:
 21899  21900 -21901 -985 -21902 0
 21899  21900 -21901 -985  21903 0
 21899  21900 -21901 -985 -21904 0

c  2+1 --> break 
c    (-b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧  p_985) -> break
c  in CNF:
c     b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ -p_985 ∨ break
c  in DIMACS:
 21899 -21900  21901 -985 1162 0


c  2-1 --> 1
c    (-b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧ -p_985) -> (-b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧  b^{197, 6}_0)
c  in CNF:
c     b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_2
c     b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_1
c     b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨  b^{197, 6}_0
c  in DIMACS:
 21899 -21900  21901  985 -21902 0
 21899 -21900  21901  985 -21903 0
 21899 -21900  21901  985  21904 0

c  1-1 --> 0
c    (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0 ∧ -p_985) -> (-b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧ -b^{197, 6}_0)
c  in CNF:
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_2
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_1
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_0
c  in DIMACS:
 21899  21900 -21901  985 -21902 0
 21899  21900 -21901  985 -21903 0
 21899  21900 -21901  985 -21904 0

c  0-1 --> -1
c    (-b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧ -p_985) -> ( b^{197, 6}_2 ∧ -b^{197, 6}_1 ∧  b^{197, 6}_0)
c  in CNF:
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨  b^{197, 6}_2
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_1
c     b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨  b^{197, 6}_0
c  in DIMACS:
 21899  21900  21901  985  21902 0
 21899  21900  21901  985 -21903 0
 21899  21900  21901  985  21904 0

c  -1-1 --> -2
c    ( b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧  b^{197, 5}_0 ∧ -p_985) -> ( b^{197, 6}_2 ∧  b^{197, 6}_1 ∧ -b^{197, 6}_0)
c  in CNF:
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨  b^{197, 6}_2
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨  b^{197, 6}_1
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨  p_985 ∨ -b^{197, 6}_0
c  in DIMACS:
-21899  21900 -21901  985  21902 0
-21899  21900 -21901  985  21903 0
-21899  21900 -21901  985 -21904 0

c  -2-1 --> break 
c    ( b^{197, 5}_2 ∧  b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧ -p_985) -> break
c  in CNF:
c    -b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨  b^{197, 5}_0 ∨  p_985 ∨ break
c  in DIMACS:
-21899 -21900  21901  985 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{197, 5}_2 ∧ -b^{197, 5}_1 ∧ -b^{197, 5}_0 ∧ true) 
c  in CNF:
c    -b^{197, 5}_2 ∨  b^{197, 5}_1 ∨  b^{197, 5}_0 ∨ false 
c  in DIMACS:
-21899  21900  21901  0

c  3 does not represent an automaton state.
c    -(-b^{197, 5}_2 ∧  b^{197, 5}_1 ∧  b^{197, 5}_0 ∧ true) 
c  in CNF:
c     b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ false 
c  in DIMACS:
 21899 -21900 -21901  0
c  -3 does not represent an automaton state.
c    -( b^{197, 5}_2 ∧  b^{197, 5}_1 ∧  b^{197, 5}_0 ∧ true) 
c  in CNF:
c    -b^{197, 5}_2 ∨ -b^{197, 5}_1 ∨ -b^{197, 5}_0 ∨ false 
c  in DIMACS:
-21899 -21900 -21901  0

c INIT for k = 198
c    -b^{198, 1}_2
c    -b^{198, 1}_1
c    -b^{198, 1}_0
c  in DIMACS:
-21905 0
-21906 0
-21907 0

c Transitions for k = 198
c i = 1
c  -2+1 --> -1
c    ( b^{198, 1}_2 ∧  b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧  p_198) -> ( b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0)
c  in CNF:
c    -b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨  b^{198, 2}_2
c    -b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_1
c    -b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨  b^{198, 2}_0
c  in DIMACS:
-21905 -21906  21907 -198  21908 0
-21905 -21906  21907 -198 -21909 0
-21905 -21906  21907 -198  21910 0

c  -1+1 --> 0
c    ( b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧  b^{198, 1}_0 ∧  p_198) -> (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧ -b^{198, 2}_0)
c  in CNF:
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_2
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_1
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_0
c  in DIMACS:
-21905  21906 -21907 -198 -21908 0
-21905  21906 -21907 -198 -21909 0
-21905  21906 -21907 -198 -21910 0

c  0+1 --> 1
c    (-b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧  p_198) -> (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0)
c  in CNF:
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_2
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_1
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨  b^{198, 2}_0
c  in DIMACS:
 21905  21906  21907 -198 -21908 0
 21905  21906  21907 -198 -21909 0
 21905  21906  21907 -198  21910 0

c  1+1 --> 2
c    (-b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧  b^{198, 1}_0 ∧  p_198) -> (-b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0)
c  in CNF:
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_2
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨  b^{198, 2}_1
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ -p_198 ∨ -b^{198, 2}_0
c  in DIMACS:
 21905  21906 -21907 -198 -21908 0
 21905  21906 -21907 -198  21909 0
 21905  21906 -21907 -198 -21910 0

c  2+1 --> break 
c    (-b^{198, 1}_2 ∧  b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧  p_198) -> break
c  in CNF:
c     b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ -p_198 ∨ break
c  in DIMACS:
 21905 -21906  21907 -198 1162 0


c  2-1 --> 1
c    (-b^{198, 1}_2 ∧  b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧ -p_198) -> (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0)
c  in CNF:
c     b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_2
c     b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_1
c     b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨  b^{198, 2}_0
c  in DIMACS:
 21905 -21906  21907  198 -21908 0
 21905 -21906  21907  198 -21909 0
 21905 -21906  21907  198  21910 0

c  1-1 --> 0
c    (-b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧  b^{198, 1}_0 ∧ -p_198) -> (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧ -b^{198, 2}_0)
c  in CNF:
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_2
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_1
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_0
c  in DIMACS:
 21905  21906 -21907  198 -21908 0
 21905  21906 -21907  198 -21909 0
 21905  21906 -21907  198 -21910 0

c  0-1 --> -1
c    (-b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧ -p_198) -> ( b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0)
c  in CNF:
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨  b^{198, 2}_2
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_1
c     b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨  b^{198, 2}_0
c  in DIMACS:
 21905  21906  21907  198  21908 0
 21905  21906  21907  198 -21909 0
 21905  21906  21907  198  21910 0

c  -1-1 --> -2
c    ( b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧  b^{198, 1}_0 ∧ -p_198) -> ( b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0)
c  in CNF:
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨  b^{198, 2}_2
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨  b^{198, 2}_1
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨  p_198 ∨ -b^{198, 2}_0
c  in DIMACS:
-21905  21906 -21907  198  21908 0
-21905  21906 -21907  198  21909 0
-21905  21906 -21907  198 -21910 0

c  -2-1 --> break 
c    ( b^{198, 1}_2 ∧  b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧ -p_198) -> break
c  in CNF:
c    -b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨  b^{198, 1}_0 ∨  p_198 ∨ break
c  in DIMACS:
-21905 -21906  21907  198 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{198, 1}_2 ∧ -b^{198, 1}_1 ∧ -b^{198, 1}_0 ∧ true) 
c  in CNF:
c    -b^{198, 1}_2 ∨  b^{198, 1}_1 ∨  b^{198, 1}_0 ∨ false 
c  in DIMACS:
-21905  21906  21907  0

c  3 does not represent an automaton state.
c    -(-b^{198, 1}_2 ∧  b^{198, 1}_1 ∧  b^{198, 1}_0 ∧ true) 
c  in CNF:
c     b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ false 
c  in DIMACS:
 21905 -21906 -21907  0
c  -3 does not represent an automaton state.
c    -( b^{198, 1}_2 ∧  b^{198, 1}_1 ∧  b^{198, 1}_0 ∧ true) 
c  in CNF:
c    -b^{198, 1}_2 ∨ -b^{198, 1}_1 ∨ -b^{198, 1}_0 ∨ false 
c  in DIMACS:
-21905 -21906 -21907  0

c i = 2
c  -2+1 --> -1
c    ( b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧  p_396) -> ( b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0)
c  in CNF:
c    -b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨  b^{198, 3}_2
c    -b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_1
c    -b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨  b^{198, 3}_0
c  in DIMACS:
-21908 -21909  21910 -396  21911 0
-21908 -21909  21910 -396 -21912 0
-21908 -21909  21910 -396  21913 0

c  -1+1 --> 0
c    ( b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0 ∧  p_396) -> (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧ -b^{198, 3}_0)
c  in CNF:
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_2
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_1
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_0
c  in DIMACS:
-21908  21909 -21910 -396 -21911 0
-21908  21909 -21910 -396 -21912 0
-21908  21909 -21910 -396 -21913 0

c  0+1 --> 1
c    (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧  p_396) -> (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0)
c  in CNF:
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_2
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_1
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨  b^{198, 3}_0
c  in DIMACS:
 21908  21909  21910 -396 -21911 0
 21908  21909  21910 -396 -21912 0
 21908  21909  21910 -396  21913 0

c  1+1 --> 2
c    (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0 ∧  p_396) -> (-b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0)
c  in CNF:
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_2
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨  b^{198, 3}_1
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ -p_396 ∨ -b^{198, 3}_0
c  in DIMACS:
 21908  21909 -21910 -396 -21911 0
 21908  21909 -21910 -396  21912 0
 21908  21909 -21910 -396 -21913 0

c  2+1 --> break 
c    (-b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧  p_396) -> break
c  in CNF:
c     b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ -p_396 ∨ break
c  in DIMACS:
 21908 -21909  21910 -396 1162 0


c  2-1 --> 1
c    (-b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧ -p_396) -> (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0)
c  in CNF:
c     b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_2
c     b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_1
c     b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨  b^{198, 3}_0
c  in DIMACS:
 21908 -21909  21910  396 -21911 0
 21908 -21909  21910  396 -21912 0
 21908 -21909  21910  396  21913 0

c  1-1 --> 0
c    (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0 ∧ -p_396) -> (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧ -b^{198, 3}_0)
c  in CNF:
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_2
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_1
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_0
c  in DIMACS:
 21908  21909 -21910  396 -21911 0
 21908  21909 -21910  396 -21912 0
 21908  21909 -21910  396 -21913 0

c  0-1 --> -1
c    (-b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧ -p_396) -> ( b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0)
c  in CNF:
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨  b^{198, 3}_2
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_1
c     b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨  b^{198, 3}_0
c  in DIMACS:
 21908  21909  21910  396  21911 0
 21908  21909  21910  396 -21912 0
 21908  21909  21910  396  21913 0

c  -1-1 --> -2
c    ( b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧  b^{198, 2}_0 ∧ -p_396) -> ( b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0)
c  in CNF:
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨  b^{198, 3}_2
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨  b^{198, 3}_1
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨  p_396 ∨ -b^{198, 3}_0
c  in DIMACS:
-21908  21909 -21910  396  21911 0
-21908  21909 -21910  396  21912 0
-21908  21909 -21910  396 -21913 0

c  -2-1 --> break 
c    ( b^{198, 2}_2 ∧  b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧ -p_396) -> break
c  in CNF:
c    -b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨  b^{198, 2}_0 ∨  p_396 ∨ break
c  in DIMACS:
-21908 -21909  21910  396 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{198, 2}_2 ∧ -b^{198, 2}_1 ∧ -b^{198, 2}_0 ∧ true) 
c  in CNF:
c    -b^{198, 2}_2 ∨  b^{198, 2}_1 ∨  b^{198, 2}_0 ∨ false 
c  in DIMACS:
-21908  21909  21910  0

c  3 does not represent an automaton state.
c    -(-b^{198, 2}_2 ∧  b^{198, 2}_1 ∧  b^{198, 2}_0 ∧ true) 
c  in CNF:
c     b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ false 
c  in DIMACS:
 21908 -21909 -21910  0
c  -3 does not represent an automaton state.
c    -( b^{198, 2}_2 ∧  b^{198, 2}_1 ∧  b^{198, 2}_0 ∧ true) 
c  in CNF:
c    -b^{198, 2}_2 ∨ -b^{198, 2}_1 ∨ -b^{198, 2}_0 ∨ false 
c  in DIMACS:
-21908 -21909 -21910  0

c i = 3
c  -2+1 --> -1
c    ( b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧  p_594) -> ( b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0)
c  in CNF:
c    -b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨  b^{198, 4}_2
c    -b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_1
c    -b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨  b^{198, 4}_0
c  in DIMACS:
-21911 -21912  21913 -594  21914 0
-21911 -21912  21913 -594 -21915 0
-21911 -21912  21913 -594  21916 0

c  -1+1 --> 0
c    ( b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0 ∧  p_594) -> (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧ -b^{198, 4}_0)
c  in CNF:
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_2
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_1
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_0
c  in DIMACS:
-21911  21912 -21913 -594 -21914 0
-21911  21912 -21913 -594 -21915 0
-21911  21912 -21913 -594 -21916 0

c  0+1 --> 1
c    (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧  p_594) -> (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0)
c  in CNF:
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_2
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_1
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨  b^{198, 4}_0
c  in DIMACS:
 21911  21912  21913 -594 -21914 0
 21911  21912  21913 -594 -21915 0
 21911  21912  21913 -594  21916 0

c  1+1 --> 2
c    (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0 ∧  p_594) -> (-b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0)
c  in CNF:
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_2
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨  b^{198, 4}_1
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ -p_594 ∨ -b^{198, 4}_0
c  in DIMACS:
 21911  21912 -21913 -594 -21914 0
 21911  21912 -21913 -594  21915 0
 21911  21912 -21913 -594 -21916 0

c  2+1 --> break 
c    (-b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧  p_594) -> break
c  in CNF:
c     b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 21911 -21912  21913 -594 1162 0


c  2-1 --> 1
c    (-b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧ -p_594) -> (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0)
c  in CNF:
c     b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_2
c     b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_1
c     b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨  b^{198, 4}_0
c  in DIMACS:
 21911 -21912  21913  594 -21914 0
 21911 -21912  21913  594 -21915 0
 21911 -21912  21913  594  21916 0

c  1-1 --> 0
c    (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0 ∧ -p_594) -> (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧ -b^{198, 4}_0)
c  in CNF:
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_2
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_1
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_0
c  in DIMACS:
 21911  21912 -21913  594 -21914 0
 21911  21912 -21913  594 -21915 0
 21911  21912 -21913  594 -21916 0

c  0-1 --> -1
c    (-b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧ -p_594) -> ( b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0)
c  in CNF:
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨  b^{198, 4}_2
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_1
c     b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨  b^{198, 4}_0
c  in DIMACS:
 21911  21912  21913  594  21914 0
 21911  21912  21913  594 -21915 0
 21911  21912  21913  594  21916 0

c  -1-1 --> -2
c    ( b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧  b^{198, 3}_0 ∧ -p_594) -> ( b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0)
c  in CNF:
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨  b^{198, 4}_2
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨  b^{198, 4}_1
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨  p_594 ∨ -b^{198, 4}_0
c  in DIMACS:
-21911  21912 -21913  594  21914 0
-21911  21912 -21913  594  21915 0
-21911  21912 -21913  594 -21916 0

c  -2-1 --> break 
c    ( b^{198, 3}_2 ∧  b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨  b^{198, 3}_0 ∨  p_594 ∨ break
c  in DIMACS:
-21911 -21912  21913  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{198, 3}_2 ∧ -b^{198, 3}_1 ∧ -b^{198, 3}_0 ∧ true) 
c  in CNF:
c    -b^{198, 3}_2 ∨  b^{198, 3}_1 ∨  b^{198, 3}_0 ∨ false 
c  in DIMACS:
-21911  21912  21913  0

c  3 does not represent an automaton state.
c    -(-b^{198, 3}_2 ∧  b^{198, 3}_1 ∧  b^{198, 3}_0 ∧ true) 
c  in CNF:
c     b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ false 
c  in DIMACS:
 21911 -21912 -21913  0
c  -3 does not represent an automaton state.
c    -( b^{198, 3}_2 ∧  b^{198, 3}_1 ∧  b^{198, 3}_0 ∧ true) 
c  in CNF:
c    -b^{198, 3}_2 ∨ -b^{198, 3}_1 ∨ -b^{198, 3}_0 ∨ false 
c  in DIMACS:
-21911 -21912 -21913  0

c i = 4
c  -2+1 --> -1
c    ( b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧  p_792) -> ( b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0)
c  in CNF:
c    -b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨  b^{198, 5}_2
c    -b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_1
c    -b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨  b^{198, 5}_0
c  in DIMACS:
-21914 -21915  21916 -792  21917 0
-21914 -21915  21916 -792 -21918 0
-21914 -21915  21916 -792  21919 0

c  -1+1 --> 0
c    ( b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0 ∧  p_792) -> (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧ -b^{198, 5}_0)
c  in CNF:
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_2
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_1
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_0
c  in DIMACS:
-21914  21915 -21916 -792 -21917 0
-21914  21915 -21916 -792 -21918 0
-21914  21915 -21916 -792 -21919 0

c  0+1 --> 1
c    (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧  p_792) -> (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0)
c  in CNF:
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_2
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_1
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨  b^{198, 5}_0
c  in DIMACS:
 21914  21915  21916 -792 -21917 0
 21914  21915  21916 -792 -21918 0
 21914  21915  21916 -792  21919 0

c  1+1 --> 2
c    (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0 ∧  p_792) -> (-b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0)
c  in CNF:
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_2
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨  b^{198, 5}_1
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ -p_792 ∨ -b^{198, 5}_0
c  in DIMACS:
 21914  21915 -21916 -792 -21917 0
 21914  21915 -21916 -792  21918 0
 21914  21915 -21916 -792 -21919 0

c  2+1 --> break 
c    (-b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧  p_792) -> break
c  in CNF:
c     b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 21914 -21915  21916 -792 1162 0


c  2-1 --> 1
c    (-b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧ -p_792) -> (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0)
c  in CNF:
c     b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_2
c     b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_1
c     b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨  b^{198, 5}_0
c  in DIMACS:
 21914 -21915  21916  792 -21917 0
 21914 -21915  21916  792 -21918 0
 21914 -21915  21916  792  21919 0

c  1-1 --> 0
c    (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0 ∧ -p_792) -> (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧ -b^{198, 5}_0)
c  in CNF:
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_2
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_1
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_0
c  in DIMACS:
 21914  21915 -21916  792 -21917 0
 21914  21915 -21916  792 -21918 0
 21914  21915 -21916  792 -21919 0

c  0-1 --> -1
c    (-b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧ -p_792) -> ( b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0)
c  in CNF:
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨  b^{198, 5}_2
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_1
c     b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨  b^{198, 5}_0
c  in DIMACS:
 21914  21915  21916  792  21917 0
 21914  21915  21916  792 -21918 0
 21914  21915  21916  792  21919 0

c  -1-1 --> -2
c    ( b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧  b^{198, 4}_0 ∧ -p_792) -> ( b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0)
c  in CNF:
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨  b^{198, 5}_2
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨  b^{198, 5}_1
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨  p_792 ∨ -b^{198, 5}_0
c  in DIMACS:
-21914  21915 -21916  792  21917 0
-21914  21915 -21916  792  21918 0
-21914  21915 -21916  792 -21919 0

c  -2-1 --> break 
c    ( b^{198, 4}_2 ∧  b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨  b^{198, 4}_0 ∨  p_792 ∨ break
c  in DIMACS:
-21914 -21915  21916  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{198, 4}_2 ∧ -b^{198, 4}_1 ∧ -b^{198, 4}_0 ∧ true) 
c  in CNF:
c    -b^{198, 4}_2 ∨  b^{198, 4}_1 ∨  b^{198, 4}_0 ∨ false 
c  in DIMACS:
-21914  21915  21916  0

c  3 does not represent an automaton state.
c    -(-b^{198, 4}_2 ∧  b^{198, 4}_1 ∧  b^{198, 4}_0 ∧ true) 
c  in CNF:
c     b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ false 
c  in DIMACS:
 21914 -21915 -21916  0
c  -3 does not represent an automaton state.
c    -( b^{198, 4}_2 ∧  b^{198, 4}_1 ∧  b^{198, 4}_0 ∧ true) 
c  in CNF:
c    -b^{198, 4}_2 ∨ -b^{198, 4}_1 ∨ -b^{198, 4}_0 ∨ false 
c  in DIMACS:
-21914 -21915 -21916  0

c i = 5
c  -2+1 --> -1
c    ( b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧  p_990) -> ( b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧  b^{198, 6}_0)
c  in CNF:
c    -b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨  b^{198, 6}_2
c    -b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_1
c    -b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨  b^{198, 6}_0
c  in DIMACS:
-21917 -21918  21919 -990  21920 0
-21917 -21918  21919 -990 -21921 0
-21917 -21918  21919 -990  21922 0

c  -1+1 --> 0
c    ( b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0 ∧  p_990) -> (-b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧ -b^{198, 6}_0)
c  in CNF:
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_2
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_1
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_0
c  in DIMACS:
-21917  21918 -21919 -990 -21920 0
-21917  21918 -21919 -990 -21921 0
-21917  21918 -21919 -990 -21922 0

c  0+1 --> 1
c    (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧  p_990) -> (-b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧  b^{198, 6}_0)
c  in CNF:
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_2
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_1
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨  b^{198, 6}_0
c  in DIMACS:
 21917  21918  21919 -990 -21920 0
 21917  21918  21919 -990 -21921 0
 21917  21918  21919 -990  21922 0

c  1+1 --> 2
c    (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0 ∧  p_990) -> (-b^{198, 6}_2 ∧  b^{198, 6}_1 ∧ -b^{198, 6}_0)
c  in CNF:
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_2
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨  b^{198, 6}_1
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ -p_990 ∨ -b^{198, 6}_0
c  in DIMACS:
 21917  21918 -21919 -990 -21920 0
 21917  21918 -21919 -990  21921 0
 21917  21918 -21919 -990 -21922 0

c  2+1 --> break 
c    (-b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧  p_990) -> break
c  in CNF:
c     b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 21917 -21918  21919 -990 1162 0


c  2-1 --> 1
c    (-b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧ -p_990) -> (-b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧  b^{198, 6}_0)
c  in CNF:
c     b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_2
c     b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_1
c     b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨  b^{198, 6}_0
c  in DIMACS:
 21917 -21918  21919  990 -21920 0
 21917 -21918  21919  990 -21921 0
 21917 -21918  21919  990  21922 0

c  1-1 --> 0
c    (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0 ∧ -p_990) -> (-b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧ -b^{198, 6}_0)
c  in CNF:
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_2
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_1
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_0
c  in DIMACS:
 21917  21918 -21919  990 -21920 0
 21917  21918 -21919  990 -21921 0
 21917  21918 -21919  990 -21922 0

c  0-1 --> -1
c    (-b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧ -p_990) -> ( b^{198, 6}_2 ∧ -b^{198, 6}_1 ∧  b^{198, 6}_0)
c  in CNF:
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨  b^{198, 6}_2
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_1
c     b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨  b^{198, 6}_0
c  in DIMACS:
 21917  21918  21919  990  21920 0
 21917  21918  21919  990 -21921 0
 21917  21918  21919  990  21922 0

c  -1-1 --> -2
c    ( b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧  b^{198, 5}_0 ∧ -p_990) -> ( b^{198, 6}_2 ∧  b^{198, 6}_1 ∧ -b^{198, 6}_0)
c  in CNF:
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨  b^{198, 6}_2
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨  b^{198, 6}_1
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨  p_990 ∨ -b^{198, 6}_0
c  in DIMACS:
-21917  21918 -21919  990  21920 0
-21917  21918 -21919  990  21921 0
-21917  21918 -21919  990 -21922 0

c  -2-1 --> break 
c    ( b^{198, 5}_2 ∧  b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨  b^{198, 5}_0 ∨  p_990 ∨ break
c  in DIMACS:
-21917 -21918  21919  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{198, 5}_2 ∧ -b^{198, 5}_1 ∧ -b^{198, 5}_0 ∧ true) 
c  in CNF:
c    -b^{198, 5}_2 ∨  b^{198, 5}_1 ∨  b^{198, 5}_0 ∨ false 
c  in DIMACS:
-21917  21918  21919  0

c  3 does not represent an automaton state.
c    -(-b^{198, 5}_2 ∧  b^{198, 5}_1 ∧  b^{198, 5}_0 ∧ true) 
c  in CNF:
c     b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ false 
c  in DIMACS:
 21917 -21918 -21919  0
c  -3 does not represent an automaton state.
c    -( b^{198, 5}_2 ∧  b^{198, 5}_1 ∧  b^{198, 5}_0 ∧ true) 
c  in CNF:
c    -b^{198, 5}_2 ∨ -b^{198, 5}_1 ∨ -b^{198, 5}_0 ∨ false 
c  in DIMACS:
-21917 -21918 -21919  0

c INIT for k = 199
c    -b^{199, 1}_2
c    -b^{199, 1}_1
c    -b^{199, 1}_0
c  in DIMACS:
-21923 0
-21924 0
-21925 0

c Transitions for k = 199
c i = 1
c  -2+1 --> -1
c    ( b^{199, 1}_2 ∧  b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧  p_199) -> ( b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0)
c  in CNF:
c    -b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨  b^{199, 2}_2
c    -b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_1
c    -b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨  b^{199, 2}_0
c  in DIMACS:
-21923 -21924  21925 -199  21926 0
-21923 -21924  21925 -199 -21927 0
-21923 -21924  21925 -199  21928 0

c  -1+1 --> 0
c    ( b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧  b^{199, 1}_0 ∧  p_199) -> (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧ -b^{199, 2}_0)
c  in CNF:
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_2
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_1
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_0
c  in DIMACS:
-21923  21924 -21925 -199 -21926 0
-21923  21924 -21925 -199 -21927 0
-21923  21924 -21925 -199 -21928 0

c  0+1 --> 1
c    (-b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧  p_199) -> (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0)
c  in CNF:
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_2
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_1
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨  b^{199, 2}_0
c  in DIMACS:
 21923  21924  21925 -199 -21926 0
 21923  21924  21925 -199 -21927 0
 21923  21924  21925 -199  21928 0

c  1+1 --> 2
c    (-b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧  b^{199, 1}_0 ∧  p_199) -> (-b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0)
c  in CNF:
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_2
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨  b^{199, 2}_1
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ -p_199 ∨ -b^{199, 2}_0
c  in DIMACS:
 21923  21924 -21925 -199 -21926 0
 21923  21924 -21925 -199  21927 0
 21923  21924 -21925 -199 -21928 0

c  2+1 --> break 
c    (-b^{199, 1}_2 ∧  b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧  p_199) -> break
c  in CNF:
c     b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ -p_199 ∨ break
c  in DIMACS:
 21923 -21924  21925 -199 1162 0


c  2-1 --> 1
c    (-b^{199, 1}_2 ∧  b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧ -p_199) -> (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0)
c  in CNF:
c     b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_2
c     b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_1
c     b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨  b^{199, 2}_0
c  in DIMACS:
 21923 -21924  21925  199 -21926 0
 21923 -21924  21925  199 -21927 0
 21923 -21924  21925  199  21928 0

c  1-1 --> 0
c    (-b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧  b^{199, 1}_0 ∧ -p_199) -> (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧ -b^{199, 2}_0)
c  in CNF:
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_2
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_1
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_0
c  in DIMACS:
 21923  21924 -21925  199 -21926 0
 21923  21924 -21925  199 -21927 0
 21923  21924 -21925  199 -21928 0

c  0-1 --> -1
c    (-b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧ -p_199) -> ( b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0)
c  in CNF:
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨  b^{199, 2}_2
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_1
c     b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨  b^{199, 2}_0
c  in DIMACS:
 21923  21924  21925  199  21926 0
 21923  21924  21925  199 -21927 0
 21923  21924  21925  199  21928 0

c  -1-1 --> -2
c    ( b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧  b^{199, 1}_0 ∧ -p_199) -> ( b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0)
c  in CNF:
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨  b^{199, 2}_2
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨  b^{199, 2}_1
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨  p_199 ∨ -b^{199, 2}_0
c  in DIMACS:
-21923  21924 -21925  199  21926 0
-21923  21924 -21925  199  21927 0
-21923  21924 -21925  199 -21928 0

c  -2-1 --> break 
c    ( b^{199, 1}_2 ∧  b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧ -p_199) -> break
c  in CNF:
c    -b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨  b^{199, 1}_0 ∨  p_199 ∨ break
c  in DIMACS:
-21923 -21924  21925  199 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{199, 1}_2 ∧ -b^{199, 1}_1 ∧ -b^{199, 1}_0 ∧ true) 
c  in CNF:
c    -b^{199, 1}_2 ∨  b^{199, 1}_1 ∨  b^{199, 1}_0 ∨ false 
c  in DIMACS:
-21923  21924  21925  0

c  3 does not represent an automaton state.
c    -(-b^{199, 1}_2 ∧  b^{199, 1}_1 ∧  b^{199, 1}_0 ∧ true) 
c  in CNF:
c     b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ false 
c  in DIMACS:
 21923 -21924 -21925  0
c  -3 does not represent an automaton state.
c    -( b^{199, 1}_2 ∧  b^{199, 1}_1 ∧  b^{199, 1}_0 ∧ true) 
c  in CNF:
c    -b^{199, 1}_2 ∨ -b^{199, 1}_1 ∨ -b^{199, 1}_0 ∨ false 
c  in DIMACS:
-21923 -21924 -21925  0

c i = 2
c  -2+1 --> -1
c    ( b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧  p_398) -> ( b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0)
c  in CNF:
c    -b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨  b^{199, 3}_2
c    -b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_1
c    -b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨  b^{199, 3}_0
c  in DIMACS:
-21926 -21927  21928 -398  21929 0
-21926 -21927  21928 -398 -21930 0
-21926 -21927  21928 -398  21931 0

c  -1+1 --> 0
c    ( b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0 ∧  p_398) -> (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧ -b^{199, 3}_0)
c  in CNF:
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_2
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_1
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_0
c  in DIMACS:
-21926  21927 -21928 -398 -21929 0
-21926  21927 -21928 -398 -21930 0
-21926  21927 -21928 -398 -21931 0

c  0+1 --> 1
c    (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧  p_398) -> (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0)
c  in CNF:
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_2
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_1
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨  b^{199, 3}_0
c  in DIMACS:
 21926  21927  21928 -398 -21929 0
 21926  21927  21928 -398 -21930 0
 21926  21927  21928 -398  21931 0

c  1+1 --> 2
c    (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0 ∧  p_398) -> (-b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0)
c  in CNF:
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_2
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨  b^{199, 3}_1
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ -p_398 ∨ -b^{199, 3}_0
c  in DIMACS:
 21926  21927 -21928 -398 -21929 0
 21926  21927 -21928 -398  21930 0
 21926  21927 -21928 -398 -21931 0

c  2+1 --> break 
c    (-b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧  p_398) -> break
c  in CNF:
c     b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ -p_398 ∨ break
c  in DIMACS:
 21926 -21927  21928 -398 1162 0


c  2-1 --> 1
c    (-b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧ -p_398) -> (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0)
c  in CNF:
c     b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_2
c     b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_1
c     b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨  b^{199, 3}_0
c  in DIMACS:
 21926 -21927  21928  398 -21929 0
 21926 -21927  21928  398 -21930 0
 21926 -21927  21928  398  21931 0

c  1-1 --> 0
c    (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0 ∧ -p_398) -> (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧ -b^{199, 3}_0)
c  in CNF:
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_2
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_1
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_0
c  in DIMACS:
 21926  21927 -21928  398 -21929 0
 21926  21927 -21928  398 -21930 0
 21926  21927 -21928  398 -21931 0

c  0-1 --> -1
c    (-b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧ -p_398) -> ( b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0)
c  in CNF:
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨  b^{199, 3}_2
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_1
c     b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨  b^{199, 3}_0
c  in DIMACS:
 21926  21927  21928  398  21929 0
 21926  21927  21928  398 -21930 0
 21926  21927  21928  398  21931 0

c  -1-1 --> -2
c    ( b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧  b^{199, 2}_0 ∧ -p_398) -> ( b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0)
c  in CNF:
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨  b^{199, 3}_2
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨  b^{199, 3}_1
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨  p_398 ∨ -b^{199, 3}_0
c  in DIMACS:
-21926  21927 -21928  398  21929 0
-21926  21927 -21928  398  21930 0
-21926  21927 -21928  398 -21931 0

c  -2-1 --> break 
c    ( b^{199, 2}_2 ∧  b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧ -p_398) -> break
c  in CNF:
c    -b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨  b^{199, 2}_0 ∨  p_398 ∨ break
c  in DIMACS:
-21926 -21927  21928  398 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{199, 2}_2 ∧ -b^{199, 2}_1 ∧ -b^{199, 2}_0 ∧ true) 
c  in CNF:
c    -b^{199, 2}_2 ∨  b^{199, 2}_1 ∨  b^{199, 2}_0 ∨ false 
c  in DIMACS:
-21926  21927  21928  0

c  3 does not represent an automaton state.
c    -(-b^{199, 2}_2 ∧  b^{199, 2}_1 ∧  b^{199, 2}_0 ∧ true) 
c  in CNF:
c     b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ false 
c  in DIMACS:
 21926 -21927 -21928  0
c  -3 does not represent an automaton state.
c    -( b^{199, 2}_2 ∧  b^{199, 2}_1 ∧  b^{199, 2}_0 ∧ true) 
c  in CNF:
c    -b^{199, 2}_2 ∨ -b^{199, 2}_1 ∨ -b^{199, 2}_0 ∨ false 
c  in DIMACS:
-21926 -21927 -21928  0

c i = 3
c  -2+1 --> -1
c    ( b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧  p_597) -> ( b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0)
c  in CNF:
c    -b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨  b^{199, 4}_2
c    -b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_1
c    -b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨  b^{199, 4}_0
c  in DIMACS:
-21929 -21930  21931 -597  21932 0
-21929 -21930  21931 -597 -21933 0
-21929 -21930  21931 -597  21934 0

c  -1+1 --> 0
c    ( b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0 ∧  p_597) -> (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧ -b^{199, 4}_0)
c  in CNF:
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_2
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_1
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_0
c  in DIMACS:
-21929  21930 -21931 -597 -21932 0
-21929  21930 -21931 -597 -21933 0
-21929  21930 -21931 -597 -21934 0

c  0+1 --> 1
c    (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧  p_597) -> (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0)
c  in CNF:
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_2
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_1
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨  b^{199, 4}_0
c  in DIMACS:
 21929  21930  21931 -597 -21932 0
 21929  21930  21931 -597 -21933 0
 21929  21930  21931 -597  21934 0

c  1+1 --> 2
c    (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0 ∧  p_597) -> (-b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0)
c  in CNF:
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_2
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨  b^{199, 4}_1
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ -p_597 ∨ -b^{199, 4}_0
c  in DIMACS:
 21929  21930 -21931 -597 -21932 0
 21929  21930 -21931 -597  21933 0
 21929  21930 -21931 -597 -21934 0

c  2+1 --> break 
c    (-b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧  p_597) -> break
c  in CNF:
c     b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ -p_597 ∨ break
c  in DIMACS:
 21929 -21930  21931 -597 1162 0


c  2-1 --> 1
c    (-b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧ -p_597) -> (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0)
c  in CNF:
c     b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_2
c     b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_1
c     b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨  b^{199, 4}_0
c  in DIMACS:
 21929 -21930  21931  597 -21932 0
 21929 -21930  21931  597 -21933 0
 21929 -21930  21931  597  21934 0

c  1-1 --> 0
c    (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0 ∧ -p_597) -> (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧ -b^{199, 4}_0)
c  in CNF:
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_2
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_1
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_0
c  in DIMACS:
 21929  21930 -21931  597 -21932 0
 21929  21930 -21931  597 -21933 0
 21929  21930 -21931  597 -21934 0

c  0-1 --> -1
c    (-b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧ -p_597) -> ( b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0)
c  in CNF:
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨  b^{199, 4}_2
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_1
c     b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨  b^{199, 4}_0
c  in DIMACS:
 21929  21930  21931  597  21932 0
 21929  21930  21931  597 -21933 0
 21929  21930  21931  597  21934 0

c  -1-1 --> -2
c    ( b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧  b^{199, 3}_0 ∧ -p_597) -> ( b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0)
c  in CNF:
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨  b^{199, 4}_2
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨  b^{199, 4}_1
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨  p_597 ∨ -b^{199, 4}_0
c  in DIMACS:
-21929  21930 -21931  597  21932 0
-21929  21930 -21931  597  21933 0
-21929  21930 -21931  597 -21934 0

c  -2-1 --> break 
c    ( b^{199, 3}_2 ∧  b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧ -p_597) -> break
c  in CNF:
c    -b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨  b^{199, 3}_0 ∨  p_597 ∨ break
c  in DIMACS:
-21929 -21930  21931  597 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{199, 3}_2 ∧ -b^{199, 3}_1 ∧ -b^{199, 3}_0 ∧ true) 
c  in CNF:
c    -b^{199, 3}_2 ∨  b^{199, 3}_1 ∨  b^{199, 3}_0 ∨ false 
c  in DIMACS:
-21929  21930  21931  0

c  3 does not represent an automaton state.
c    -(-b^{199, 3}_2 ∧  b^{199, 3}_1 ∧  b^{199, 3}_0 ∧ true) 
c  in CNF:
c     b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ false 
c  in DIMACS:
 21929 -21930 -21931  0
c  -3 does not represent an automaton state.
c    -( b^{199, 3}_2 ∧  b^{199, 3}_1 ∧  b^{199, 3}_0 ∧ true) 
c  in CNF:
c    -b^{199, 3}_2 ∨ -b^{199, 3}_1 ∨ -b^{199, 3}_0 ∨ false 
c  in DIMACS:
-21929 -21930 -21931  0

c i = 4
c  -2+1 --> -1
c    ( b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧  p_796) -> ( b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0)
c  in CNF:
c    -b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨  b^{199, 5}_2
c    -b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_1
c    -b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨  b^{199, 5}_0
c  in DIMACS:
-21932 -21933  21934 -796  21935 0
-21932 -21933  21934 -796 -21936 0
-21932 -21933  21934 -796  21937 0

c  -1+1 --> 0
c    ( b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0 ∧  p_796) -> (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧ -b^{199, 5}_0)
c  in CNF:
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_2
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_1
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_0
c  in DIMACS:
-21932  21933 -21934 -796 -21935 0
-21932  21933 -21934 -796 -21936 0
-21932  21933 -21934 -796 -21937 0

c  0+1 --> 1
c    (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧  p_796) -> (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0)
c  in CNF:
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_2
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_1
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨  b^{199, 5}_0
c  in DIMACS:
 21932  21933  21934 -796 -21935 0
 21932  21933  21934 -796 -21936 0
 21932  21933  21934 -796  21937 0

c  1+1 --> 2
c    (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0 ∧  p_796) -> (-b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0)
c  in CNF:
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_2
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨  b^{199, 5}_1
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ -p_796 ∨ -b^{199, 5}_0
c  in DIMACS:
 21932  21933 -21934 -796 -21935 0
 21932  21933 -21934 -796  21936 0
 21932  21933 -21934 -796 -21937 0

c  2+1 --> break 
c    (-b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧  p_796) -> break
c  in CNF:
c     b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ -p_796 ∨ break
c  in DIMACS:
 21932 -21933  21934 -796 1162 0


c  2-1 --> 1
c    (-b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧ -p_796) -> (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0)
c  in CNF:
c     b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_2
c     b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_1
c     b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨  b^{199, 5}_0
c  in DIMACS:
 21932 -21933  21934  796 -21935 0
 21932 -21933  21934  796 -21936 0
 21932 -21933  21934  796  21937 0

c  1-1 --> 0
c    (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0 ∧ -p_796) -> (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧ -b^{199, 5}_0)
c  in CNF:
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_2
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_1
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_0
c  in DIMACS:
 21932  21933 -21934  796 -21935 0
 21932  21933 -21934  796 -21936 0
 21932  21933 -21934  796 -21937 0

c  0-1 --> -1
c    (-b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧ -p_796) -> ( b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0)
c  in CNF:
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨  b^{199, 5}_2
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_1
c     b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨  b^{199, 5}_0
c  in DIMACS:
 21932  21933  21934  796  21935 0
 21932  21933  21934  796 -21936 0
 21932  21933  21934  796  21937 0

c  -1-1 --> -2
c    ( b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧  b^{199, 4}_0 ∧ -p_796) -> ( b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0)
c  in CNF:
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨  b^{199, 5}_2
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨  b^{199, 5}_1
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨  p_796 ∨ -b^{199, 5}_0
c  in DIMACS:
-21932  21933 -21934  796  21935 0
-21932  21933 -21934  796  21936 0
-21932  21933 -21934  796 -21937 0

c  -2-1 --> break 
c    ( b^{199, 4}_2 ∧  b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧ -p_796) -> break
c  in CNF:
c    -b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨  b^{199, 4}_0 ∨  p_796 ∨ break
c  in DIMACS:
-21932 -21933  21934  796 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{199, 4}_2 ∧ -b^{199, 4}_1 ∧ -b^{199, 4}_0 ∧ true) 
c  in CNF:
c    -b^{199, 4}_2 ∨  b^{199, 4}_1 ∨  b^{199, 4}_0 ∨ false 
c  in DIMACS:
-21932  21933  21934  0

c  3 does not represent an automaton state.
c    -(-b^{199, 4}_2 ∧  b^{199, 4}_1 ∧  b^{199, 4}_0 ∧ true) 
c  in CNF:
c     b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ false 
c  in DIMACS:
 21932 -21933 -21934  0
c  -3 does not represent an automaton state.
c    -( b^{199, 4}_2 ∧  b^{199, 4}_1 ∧  b^{199, 4}_0 ∧ true) 
c  in CNF:
c    -b^{199, 4}_2 ∨ -b^{199, 4}_1 ∨ -b^{199, 4}_0 ∨ false 
c  in DIMACS:
-21932 -21933 -21934  0

c i = 5
c  -2+1 --> -1
c    ( b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧  p_995) -> ( b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧  b^{199, 6}_0)
c  in CNF:
c    -b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨  b^{199, 6}_2
c    -b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_1
c    -b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨  b^{199, 6}_0
c  in DIMACS:
-21935 -21936  21937 -995  21938 0
-21935 -21936  21937 -995 -21939 0
-21935 -21936  21937 -995  21940 0

c  -1+1 --> 0
c    ( b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0 ∧  p_995) -> (-b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧ -b^{199, 6}_0)
c  in CNF:
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_2
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_1
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_0
c  in DIMACS:
-21935  21936 -21937 -995 -21938 0
-21935  21936 -21937 -995 -21939 0
-21935  21936 -21937 -995 -21940 0

c  0+1 --> 1
c    (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧  p_995) -> (-b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧  b^{199, 6}_0)
c  in CNF:
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_2
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_1
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨  b^{199, 6}_0
c  in DIMACS:
 21935  21936  21937 -995 -21938 0
 21935  21936  21937 -995 -21939 0
 21935  21936  21937 -995  21940 0

c  1+1 --> 2
c    (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0 ∧  p_995) -> (-b^{199, 6}_2 ∧  b^{199, 6}_1 ∧ -b^{199, 6}_0)
c  in CNF:
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_2
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨  b^{199, 6}_1
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ -p_995 ∨ -b^{199, 6}_0
c  in DIMACS:
 21935  21936 -21937 -995 -21938 0
 21935  21936 -21937 -995  21939 0
 21935  21936 -21937 -995 -21940 0

c  2+1 --> break 
c    (-b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧  p_995) -> break
c  in CNF:
c     b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ -p_995 ∨ break
c  in DIMACS:
 21935 -21936  21937 -995 1162 0


c  2-1 --> 1
c    (-b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧ -p_995) -> (-b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧  b^{199, 6}_0)
c  in CNF:
c     b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_2
c     b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_1
c     b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨  b^{199, 6}_0
c  in DIMACS:
 21935 -21936  21937  995 -21938 0
 21935 -21936  21937  995 -21939 0
 21935 -21936  21937  995  21940 0

c  1-1 --> 0
c    (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0 ∧ -p_995) -> (-b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧ -b^{199, 6}_0)
c  in CNF:
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_2
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_1
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_0
c  in DIMACS:
 21935  21936 -21937  995 -21938 0
 21935  21936 -21937  995 -21939 0
 21935  21936 -21937  995 -21940 0

c  0-1 --> -1
c    (-b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧ -p_995) -> ( b^{199, 6}_2 ∧ -b^{199, 6}_1 ∧  b^{199, 6}_0)
c  in CNF:
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨  b^{199, 6}_2
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_1
c     b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨  b^{199, 6}_0
c  in DIMACS:
 21935  21936  21937  995  21938 0
 21935  21936  21937  995 -21939 0
 21935  21936  21937  995  21940 0

c  -1-1 --> -2
c    ( b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧  b^{199, 5}_0 ∧ -p_995) -> ( b^{199, 6}_2 ∧  b^{199, 6}_1 ∧ -b^{199, 6}_0)
c  in CNF:
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨  b^{199, 6}_2
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨  b^{199, 6}_1
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨  p_995 ∨ -b^{199, 6}_0
c  in DIMACS:
-21935  21936 -21937  995  21938 0
-21935  21936 -21937  995  21939 0
-21935  21936 -21937  995 -21940 0

c  -2-1 --> break 
c    ( b^{199, 5}_2 ∧  b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧ -p_995) -> break
c  in CNF:
c    -b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨  b^{199, 5}_0 ∨  p_995 ∨ break
c  in DIMACS:
-21935 -21936  21937  995 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{199, 5}_2 ∧ -b^{199, 5}_1 ∧ -b^{199, 5}_0 ∧ true) 
c  in CNF:
c    -b^{199, 5}_2 ∨  b^{199, 5}_1 ∨  b^{199, 5}_0 ∨ false 
c  in DIMACS:
-21935  21936  21937  0

c  3 does not represent an automaton state.
c    -(-b^{199, 5}_2 ∧  b^{199, 5}_1 ∧  b^{199, 5}_0 ∧ true) 
c  in CNF:
c     b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ false 
c  in DIMACS:
 21935 -21936 -21937  0
c  -3 does not represent an automaton state.
c    -( b^{199, 5}_2 ∧  b^{199, 5}_1 ∧  b^{199, 5}_0 ∧ true) 
c  in CNF:
c    -b^{199, 5}_2 ∨ -b^{199, 5}_1 ∨ -b^{199, 5}_0 ∨ false 
c  in DIMACS:
-21935 -21936 -21937  0

c INIT for k = 200
c    -b^{200, 1}_2
c    -b^{200, 1}_1
c    -b^{200, 1}_0
c  in DIMACS:
-21941 0
-21942 0
-21943 0

c Transitions for k = 200
c i = 1
c  -2+1 --> -1
c    ( b^{200, 1}_2 ∧  b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧  p_200) -> ( b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0)
c  in CNF:
c    -b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨  b^{200, 2}_2
c    -b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_1
c    -b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨  b^{200, 2}_0
c  in DIMACS:
-21941 -21942  21943 -200  21944 0
-21941 -21942  21943 -200 -21945 0
-21941 -21942  21943 -200  21946 0

c  -1+1 --> 0
c    ( b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧  b^{200, 1}_0 ∧  p_200) -> (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧ -b^{200, 2}_0)
c  in CNF:
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_2
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_1
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_0
c  in DIMACS:
-21941  21942 -21943 -200 -21944 0
-21941  21942 -21943 -200 -21945 0
-21941  21942 -21943 -200 -21946 0

c  0+1 --> 1
c    (-b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧  p_200) -> (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0)
c  in CNF:
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_2
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_1
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨  b^{200, 2}_0
c  in DIMACS:
 21941  21942  21943 -200 -21944 0
 21941  21942  21943 -200 -21945 0
 21941  21942  21943 -200  21946 0

c  1+1 --> 2
c    (-b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧  b^{200, 1}_0 ∧  p_200) -> (-b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0)
c  in CNF:
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_2
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨  b^{200, 2}_1
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ -p_200 ∨ -b^{200, 2}_0
c  in DIMACS:
 21941  21942 -21943 -200 -21944 0
 21941  21942 -21943 -200  21945 0
 21941  21942 -21943 -200 -21946 0

c  2+1 --> break 
c    (-b^{200, 1}_2 ∧  b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧  p_200) -> break
c  in CNF:
c     b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ -p_200 ∨ break
c  in DIMACS:
 21941 -21942  21943 -200 1162 0


c  2-1 --> 1
c    (-b^{200, 1}_2 ∧  b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧ -p_200) -> (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0)
c  in CNF:
c     b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_2
c     b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_1
c     b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨  b^{200, 2}_0
c  in DIMACS:
 21941 -21942  21943  200 -21944 0
 21941 -21942  21943  200 -21945 0
 21941 -21942  21943  200  21946 0

c  1-1 --> 0
c    (-b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧  b^{200, 1}_0 ∧ -p_200) -> (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧ -b^{200, 2}_0)
c  in CNF:
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_2
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_1
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_0
c  in DIMACS:
 21941  21942 -21943  200 -21944 0
 21941  21942 -21943  200 -21945 0
 21941  21942 -21943  200 -21946 0

c  0-1 --> -1
c    (-b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧ -p_200) -> ( b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0)
c  in CNF:
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨  b^{200, 2}_2
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_1
c     b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨  b^{200, 2}_0
c  in DIMACS:
 21941  21942  21943  200  21944 0
 21941  21942  21943  200 -21945 0
 21941  21942  21943  200  21946 0

c  -1-1 --> -2
c    ( b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧  b^{200, 1}_0 ∧ -p_200) -> ( b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0)
c  in CNF:
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨  b^{200, 2}_2
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨  b^{200, 2}_1
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨  p_200 ∨ -b^{200, 2}_0
c  in DIMACS:
-21941  21942 -21943  200  21944 0
-21941  21942 -21943  200  21945 0
-21941  21942 -21943  200 -21946 0

c  -2-1 --> break 
c    ( b^{200, 1}_2 ∧  b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧ -p_200) -> break
c  in CNF:
c    -b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨  b^{200, 1}_0 ∨  p_200 ∨ break
c  in DIMACS:
-21941 -21942  21943  200 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{200, 1}_2 ∧ -b^{200, 1}_1 ∧ -b^{200, 1}_0 ∧ true) 
c  in CNF:
c    -b^{200, 1}_2 ∨  b^{200, 1}_1 ∨  b^{200, 1}_0 ∨ false 
c  in DIMACS:
-21941  21942  21943  0

c  3 does not represent an automaton state.
c    -(-b^{200, 1}_2 ∧  b^{200, 1}_1 ∧  b^{200, 1}_0 ∧ true) 
c  in CNF:
c     b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ false 
c  in DIMACS:
 21941 -21942 -21943  0
c  -3 does not represent an automaton state.
c    -( b^{200, 1}_2 ∧  b^{200, 1}_1 ∧  b^{200, 1}_0 ∧ true) 
c  in CNF:
c    -b^{200, 1}_2 ∨ -b^{200, 1}_1 ∨ -b^{200, 1}_0 ∨ false 
c  in DIMACS:
-21941 -21942 -21943  0

c i = 2
c  -2+1 --> -1
c    ( b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧  p_400) -> ( b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0)
c  in CNF:
c    -b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨  b^{200, 3}_2
c    -b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_1
c    -b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨  b^{200, 3}_0
c  in DIMACS:
-21944 -21945  21946 -400  21947 0
-21944 -21945  21946 -400 -21948 0
-21944 -21945  21946 -400  21949 0

c  -1+1 --> 0
c    ( b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0 ∧  p_400) -> (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧ -b^{200, 3}_0)
c  in CNF:
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_2
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_1
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_0
c  in DIMACS:
-21944  21945 -21946 -400 -21947 0
-21944  21945 -21946 -400 -21948 0
-21944  21945 -21946 -400 -21949 0

c  0+1 --> 1
c    (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧  p_400) -> (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0)
c  in CNF:
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_2
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_1
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨  b^{200, 3}_0
c  in DIMACS:
 21944  21945  21946 -400 -21947 0
 21944  21945  21946 -400 -21948 0
 21944  21945  21946 -400  21949 0

c  1+1 --> 2
c    (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0 ∧  p_400) -> (-b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0)
c  in CNF:
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_2
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨  b^{200, 3}_1
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ -p_400 ∨ -b^{200, 3}_0
c  in DIMACS:
 21944  21945 -21946 -400 -21947 0
 21944  21945 -21946 -400  21948 0
 21944  21945 -21946 -400 -21949 0

c  2+1 --> break 
c    (-b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧  p_400) -> break
c  in CNF:
c     b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ -p_400 ∨ break
c  in DIMACS:
 21944 -21945  21946 -400 1162 0


c  2-1 --> 1
c    (-b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧ -p_400) -> (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0)
c  in CNF:
c     b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_2
c     b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_1
c     b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨  b^{200, 3}_0
c  in DIMACS:
 21944 -21945  21946  400 -21947 0
 21944 -21945  21946  400 -21948 0
 21944 -21945  21946  400  21949 0

c  1-1 --> 0
c    (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0 ∧ -p_400) -> (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧ -b^{200, 3}_0)
c  in CNF:
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_2
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_1
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_0
c  in DIMACS:
 21944  21945 -21946  400 -21947 0
 21944  21945 -21946  400 -21948 0
 21944  21945 -21946  400 -21949 0

c  0-1 --> -1
c    (-b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧ -p_400) -> ( b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0)
c  in CNF:
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨  b^{200, 3}_2
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_1
c     b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨  b^{200, 3}_0
c  in DIMACS:
 21944  21945  21946  400  21947 0
 21944  21945  21946  400 -21948 0
 21944  21945  21946  400  21949 0

c  -1-1 --> -2
c    ( b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧  b^{200, 2}_0 ∧ -p_400) -> ( b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0)
c  in CNF:
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨  b^{200, 3}_2
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨  b^{200, 3}_1
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨  p_400 ∨ -b^{200, 3}_0
c  in DIMACS:
-21944  21945 -21946  400  21947 0
-21944  21945 -21946  400  21948 0
-21944  21945 -21946  400 -21949 0

c  -2-1 --> break 
c    ( b^{200, 2}_2 ∧  b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧ -p_400) -> break
c  in CNF:
c    -b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨  b^{200, 2}_0 ∨  p_400 ∨ break
c  in DIMACS:
-21944 -21945  21946  400 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{200, 2}_2 ∧ -b^{200, 2}_1 ∧ -b^{200, 2}_0 ∧ true) 
c  in CNF:
c    -b^{200, 2}_2 ∨  b^{200, 2}_1 ∨  b^{200, 2}_0 ∨ false 
c  in DIMACS:
-21944  21945  21946  0

c  3 does not represent an automaton state.
c    -(-b^{200, 2}_2 ∧  b^{200, 2}_1 ∧  b^{200, 2}_0 ∧ true) 
c  in CNF:
c     b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ false 
c  in DIMACS:
 21944 -21945 -21946  0
c  -3 does not represent an automaton state.
c    -( b^{200, 2}_2 ∧  b^{200, 2}_1 ∧  b^{200, 2}_0 ∧ true) 
c  in CNF:
c    -b^{200, 2}_2 ∨ -b^{200, 2}_1 ∨ -b^{200, 2}_0 ∨ false 
c  in DIMACS:
-21944 -21945 -21946  0

c i = 3
c  -2+1 --> -1
c    ( b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧  p_600) -> ( b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0)
c  in CNF:
c    -b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨  b^{200, 4}_2
c    -b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_1
c    -b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨  b^{200, 4}_0
c  in DIMACS:
-21947 -21948  21949 -600  21950 0
-21947 -21948  21949 -600 -21951 0
-21947 -21948  21949 -600  21952 0

c  -1+1 --> 0
c    ( b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0 ∧  p_600) -> (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧ -b^{200, 4}_0)
c  in CNF:
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_2
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_1
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_0
c  in DIMACS:
-21947  21948 -21949 -600 -21950 0
-21947  21948 -21949 -600 -21951 0
-21947  21948 -21949 -600 -21952 0

c  0+1 --> 1
c    (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧  p_600) -> (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0)
c  in CNF:
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_2
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_1
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨  b^{200, 4}_0
c  in DIMACS:
 21947  21948  21949 -600 -21950 0
 21947  21948  21949 -600 -21951 0
 21947  21948  21949 -600  21952 0

c  1+1 --> 2
c    (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0 ∧  p_600) -> (-b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0)
c  in CNF:
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_2
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨  b^{200, 4}_1
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ -p_600 ∨ -b^{200, 4}_0
c  in DIMACS:
 21947  21948 -21949 -600 -21950 0
 21947  21948 -21949 -600  21951 0
 21947  21948 -21949 -600 -21952 0

c  2+1 --> break 
c    (-b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧  p_600) -> break
c  in CNF:
c     b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 21947 -21948  21949 -600 1162 0


c  2-1 --> 1
c    (-b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧ -p_600) -> (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0)
c  in CNF:
c     b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_2
c     b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_1
c     b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨  b^{200, 4}_0
c  in DIMACS:
 21947 -21948  21949  600 -21950 0
 21947 -21948  21949  600 -21951 0
 21947 -21948  21949  600  21952 0

c  1-1 --> 0
c    (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0 ∧ -p_600) -> (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧ -b^{200, 4}_0)
c  in CNF:
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_2
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_1
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_0
c  in DIMACS:
 21947  21948 -21949  600 -21950 0
 21947  21948 -21949  600 -21951 0
 21947  21948 -21949  600 -21952 0

c  0-1 --> -1
c    (-b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧ -p_600) -> ( b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0)
c  in CNF:
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨  b^{200, 4}_2
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_1
c     b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨  b^{200, 4}_0
c  in DIMACS:
 21947  21948  21949  600  21950 0
 21947  21948  21949  600 -21951 0
 21947  21948  21949  600  21952 0

c  -1-1 --> -2
c    ( b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧  b^{200, 3}_0 ∧ -p_600) -> ( b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0)
c  in CNF:
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨  b^{200, 4}_2
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨  b^{200, 4}_1
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨  p_600 ∨ -b^{200, 4}_0
c  in DIMACS:
-21947  21948 -21949  600  21950 0
-21947  21948 -21949  600  21951 0
-21947  21948 -21949  600 -21952 0

c  -2-1 --> break 
c    ( b^{200, 3}_2 ∧  b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨  b^{200, 3}_0 ∨  p_600 ∨ break
c  in DIMACS:
-21947 -21948  21949  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{200, 3}_2 ∧ -b^{200, 3}_1 ∧ -b^{200, 3}_0 ∧ true) 
c  in CNF:
c    -b^{200, 3}_2 ∨  b^{200, 3}_1 ∨  b^{200, 3}_0 ∨ false 
c  in DIMACS:
-21947  21948  21949  0

c  3 does not represent an automaton state.
c    -(-b^{200, 3}_2 ∧  b^{200, 3}_1 ∧  b^{200, 3}_0 ∧ true) 
c  in CNF:
c     b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ false 
c  in DIMACS:
 21947 -21948 -21949  0
c  -3 does not represent an automaton state.
c    -( b^{200, 3}_2 ∧  b^{200, 3}_1 ∧  b^{200, 3}_0 ∧ true) 
c  in CNF:
c    -b^{200, 3}_2 ∨ -b^{200, 3}_1 ∨ -b^{200, 3}_0 ∨ false 
c  in DIMACS:
-21947 -21948 -21949  0

c i = 4
c  -2+1 --> -1
c    ( b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧  p_800) -> ( b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0)
c  in CNF:
c    -b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨  b^{200, 5}_2
c    -b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_1
c    -b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨  b^{200, 5}_0
c  in DIMACS:
-21950 -21951  21952 -800  21953 0
-21950 -21951  21952 -800 -21954 0
-21950 -21951  21952 -800  21955 0

c  -1+1 --> 0
c    ( b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0 ∧  p_800) -> (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧ -b^{200, 5}_0)
c  in CNF:
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_2
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_1
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_0
c  in DIMACS:
-21950  21951 -21952 -800 -21953 0
-21950  21951 -21952 -800 -21954 0
-21950  21951 -21952 -800 -21955 0

c  0+1 --> 1
c    (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧  p_800) -> (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0)
c  in CNF:
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_2
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_1
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨  b^{200, 5}_0
c  in DIMACS:
 21950  21951  21952 -800 -21953 0
 21950  21951  21952 -800 -21954 0
 21950  21951  21952 -800  21955 0

c  1+1 --> 2
c    (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0 ∧  p_800) -> (-b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0)
c  in CNF:
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_2
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨  b^{200, 5}_1
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ -p_800 ∨ -b^{200, 5}_0
c  in DIMACS:
 21950  21951 -21952 -800 -21953 0
 21950  21951 -21952 -800  21954 0
 21950  21951 -21952 -800 -21955 0

c  2+1 --> break 
c    (-b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧  p_800) -> break
c  in CNF:
c     b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ -p_800 ∨ break
c  in DIMACS:
 21950 -21951  21952 -800 1162 0


c  2-1 --> 1
c    (-b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧ -p_800) -> (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0)
c  in CNF:
c     b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_2
c     b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_1
c     b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨  b^{200, 5}_0
c  in DIMACS:
 21950 -21951  21952  800 -21953 0
 21950 -21951  21952  800 -21954 0
 21950 -21951  21952  800  21955 0

c  1-1 --> 0
c    (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0 ∧ -p_800) -> (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧ -b^{200, 5}_0)
c  in CNF:
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_2
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_1
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_0
c  in DIMACS:
 21950  21951 -21952  800 -21953 0
 21950  21951 -21952  800 -21954 0
 21950  21951 -21952  800 -21955 0

c  0-1 --> -1
c    (-b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧ -p_800) -> ( b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0)
c  in CNF:
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨  b^{200, 5}_2
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_1
c     b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨  b^{200, 5}_0
c  in DIMACS:
 21950  21951  21952  800  21953 0
 21950  21951  21952  800 -21954 0
 21950  21951  21952  800  21955 0

c  -1-1 --> -2
c    ( b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧  b^{200, 4}_0 ∧ -p_800) -> ( b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0)
c  in CNF:
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨  b^{200, 5}_2
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨  b^{200, 5}_1
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨  p_800 ∨ -b^{200, 5}_0
c  in DIMACS:
-21950  21951 -21952  800  21953 0
-21950  21951 -21952  800  21954 0
-21950  21951 -21952  800 -21955 0

c  -2-1 --> break 
c    ( b^{200, 4}_2 ∧  b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧ -p_800) -> break
c  in CNF:
c    -b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨  b^{200, 4}_0 ∨  p_800 ∨ break
c  in DIMACS:
-21950 -21951  21952  800 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{200, 4}_2 ∧ -b^{200, 4}_1 ∧ -b^{200, 4}_0 ∧ true) 
c  in CNF:
c    -b^{200, 4}_2 ∨  b^{200, 4}_1 ∨  b^{200, 4}_0 ∨ false 
c  in DIMACS:
-21950  21951  21952  0

c  3 does not represent an automaton state.
c    -(-b^{200, 4}_2 ∧  b^{200, 4}_1 ∧  b^{200, 4}_0 ∧ true) 
c  in CNF:
c     b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ false 
c  in DIMACS:
 21950 -21951 -21952  0
c  -3 does not represent an automaton state.
c    -( b^{200, 4}_2 ∧  b^{200, 4}_1 ∧  b^{200, 4}_0 ∧ true) 
c  in CNF:
c    -b^{200, 4}_2 ∨ -b^{200, 4}_1 ∨ -b^{200, 4}_0 ∨ false 
c  in DIMACS:
-21950 -21951 -21952  0

c i = 5
c  -2+1 --> -1
c    ( b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧  p_1000) -> ( b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧  b^{200, 6}_0)
c  in CNF:
c    -b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨  b^{200, 6}_2
c    -b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_1
c    -b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨  b^{200, 6}_0
c  in DIMACS:
-21953 -21954  21955 -1000  21956 0
-21953 -21954  21955 -1000 -21957 0
-21953 -21954  21955 -1000  21958 0

c  -1+1 --> 0
c    ( b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0 ∧  p_1000) -> (-b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧ -b^{200, 6}_0)
c  in CNF:
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_2
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_1
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_0
c  in DIMACS:
-21953  21954 -21955 -1000 -21956 0
-21953  21954 -21955 -1000 -21957 0
-21953  21954 -21955 -1000 -21958 0

c  0+1 --> 1
c    (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧  p_1000) -> (-b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧  b^{200, 6}_0)
c  in CNF:
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_2
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_1
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨  b^{200, 6}_0
c  in DIMACS:
 21953  21954  21955 -1000 -21956 0
 21953  21954  21955 -1000 -21957 0
 21953  21954  21955 -1000  21958 0

c  1+1 --> 2
c    (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0 ∧  p_1000) -> (-b^{200, 6}_2 ∧  b^{200, 6}_1 ∧ -b^{200, 6}_0)
c  in CNF:
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_2
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨  b^{200, 6}_1
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ -p_1000 ∨ -b^{200, 6}_0
c  in DIMACS:
 21953  21954 -21955 -1000 -21956 0
 21953  21954 -21955 -1000  21957 0
 21953  21954 -21955 -1000 -21958 0

c  2+1 --> break 
c    (-b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 21953 -21954  21955 -1000 1162 0


c  2-1 --> 1
c    (-b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧ -p_1000) -> (-b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧  b^{200, 6}_0)
c  in CNF:
c     b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_2
c     b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_1
c     b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨  b^{200, 6}_0
c  in DIMACS:
 21953 -21954  21955  1000 -21956 0
 21953 -21954  21955  1000 -21957 0
 21953 -21954  21955  1000  21958 0

c  1-1 --> 0
c    (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0 ∧ -p_1000) -> (-b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧ -b^{200, 6}_0)
c  in CNF:
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_2
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_1
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_0
c  in DIMACS:
 21953  21954 -21955  1000 -21956 0
 21953  21954 -21955  1000 -21957 0
 21953  21954 -21955  1000 -21958 0

c  0-1 --> -1
c    (-b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧ -p_1000) -> ( b^{200, 6}_2 ∧ -b^{200, 6}_1 ∧  b^{200, 6}_0)
c  in CNF:
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨  b^{200, 6}_2
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_1
c     b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨  b^{200, 6}_0
c  in DIMACS:
 21953  21954  21955  1000  21956 0
 21953  21954  21955  1000 -21957 0
 21953  21954  21955  1000  21958 0

c  -1-1 --> -2
c    ( b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧  b^{200, 5}_0 ∧ -p_1000) -> ( b^{200, 6}_2 ∧  b^{200, 6}_1 ∧ -b^{200, 6}_0)
c  in CNF:
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨  b^{200, 6}_2
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨  b^{200, 6}_1
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨  p_1000 ∨ -b^{200, 6}_0
c  in DIMACS:
-21953  21954 -21955  1000  21956 0
-21953  21954 -21955  1000  21957 0
-21953  21954 -21955  1000 -21958 0

c  -2-1 --> break 
c    ( b^{200, 5}_2 ∧  b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨  b^{200, 5}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-21953 -21954  21955  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{200, 5}_2 ∧ -b^{200, 5}_1 ∧ -b^{200, 5}_0 ∧ true) 
c  in CNF:
c    -b^{200, 5}_2 ∨  b^{200, 5}_1 ∨  b^{200, 5}_0 ∨ false 
c  in DIMACS:
-21953  21954  21955  0

c  3 does not represent an automaton state.
c    -(-b^{200, 5}_2 ∧  b^{200, 5}_1 ∧  b^{200, 5}_0 ∧ true) 
c  in CNF:
c     b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ false 
c  in DIMACS:
 21953 -21954 -21955  0
c  -3 does not represent an automaton state.
c    -( b^{200, 5}_2 ∧  b^{200, 5}_1 ∧  b^{200, 5}_0 ∧ true) 
c  in CNF:
c    -b^{200, 5}_2 ∨ -b^{200, 5}_1 ∨ -b^{200, 5}_0 ∨ false 
c  in DIMACS:
-21953 -21954 -21955  0

c INIT for k = 201
c    -b^{201, 1}_2
c    -b^{201, 1}_1
c    -b^{201, 1}_0
c  in DIMACS:
-21959 0
-21960 0
-21961 0

c Transitions for k = 201
c i = 1
c  -2+1 --> -1
c    ( b^{201, 1}_2 ∧  b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧  p_201) -> ( b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0)
c  in CNF:
c    -b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨  b^{201, 2}_2
c    -b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_1
c    -b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨  b^{201, 2}_0
c  in DIMACS:
-21959 -21960  21961 -201  21962 0
-21959 -21960  21961 -201 -21963 0
-21959 -21960  21961 -201  21964 0

c  -1+1 --> 0
c    ( b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧  b^{201, 1}_0 ∧  p_201) -> (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧ -b^{201, 2}_0)
c  in CNF:
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_2
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_1
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_0
c  in DIMACS:
-21959  21960 -21961 -201 -21962 0
-21959  21960 -21961 -201 -21963 0
-21959  21960 -21961 -201 -21964 0

c  0+1 --> 1
c    (-b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧  p_201) -> (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0)
c  in CNF:
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_2
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_1
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨  b^{201, 2}_0
c  in DIMACS:
 21959  21960  21961 -201 -21962 0
 21959  21960  21961 -201 -21963 0
 21959  21960  21961 -201  21964 0

c  1+1 --> 2
c    (-b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧  b^{201, 1}_0 ∧  p_201) -> (-b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0)
c  in CNF:
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_2
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨  b^{201, 2}_1
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ -p_201 ∨ -b^{201, 2}_0
c  in DIMACS:
 21959  21960 -21961 -201 -21962 0
 21959  21960 -21961 -201  21963 0
 21959  21960 -21961 -201 -21964 0

c  2+1 --> break 
c    (-b^{201, 1}_2 ∧  b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧  p_201) -> break
c  in CNF:
c     b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ -p_201 ∨ break
c  in DIMACS:
 21959 -21960  21961 -201 1162 0


c  2-1 --> 1
c    (-b^{201, 1}_2 ∧  b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧ -p_201) -> (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0)
c  in CNF:
c     b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_2
c     b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_1
c     b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨  b^{201, 2}_0
c  in DIMACS:
 21959 -21960  21961  201 -21962 0
 21959 -21960  21961  201 -21963 0
 21959 -21960  21961  201  21964 0

c  1-1 --> 0
c    (-b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧  b^{201, 1}_0 ∧ -p_201) -> (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧ -b^{201, 2}_0)
c  in CNF:
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_2
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_1
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_0
c  in DIMACS:
 21959  21960 -21961  201 -21962 0
 21959  21960 -21961  201 -21963 0
 21959  21960 -21961  201 -21964 0

c  0-1 --> -1
c    (-b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧ -p_201) -> ( b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0)
c  in CNF:
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨  b^{201, 2}_2
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_1
c     b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨  b^{201, 2}_0
c  in DIMACS:
 21959  21960  21961  201  21962 0
 21959  21960  21961  201 -21963 0
 21959  21960  21961  201  21964 0

c  -1-1 --> -2
c    ( b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧  b^{201, 1}_0 ∧ -p_201) -> ( b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0)
c  in CNF:
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨  b^{201, 2}_2
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨  b^{201, 2}_1
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨  p_201 ∨ -b^{201, 2}_0
c  in DIMACS:
-21959  21960 -21961  201  21962 0
-21959  21960 -21961  201  21963 0
-21959  21960 -21961  201 -21964 0

c  -2-1 --> break 
c    ( b^{201, 1}_2 ∧  b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧ -p_201) -> break
c  in CNF:
c    -b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨  b^{201, 1}_0 ∨  p_201 ∨ break
c  in DIMACS:
-21959 -21960  21961  201 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{201, 1}_2 ∧ -b^{201, 1}_1 ∧ -b^{201, 1}_0 ∧ true) 
c  in CNF:
c    -b^{201, 1}_2 ∨  b^{201, 1}_1 ∨  b^{201, 1}_0 ∨ false 
c  in DIMACS:
-21959  21960  21961  0

c  3 does not represent an automaton state.
c    -(-b^{201, 1}_2 ∧  b^{201, 1}_1 ∧  b^{201, 1}_0 ∧ true) 
c  in CNF:
c     b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ false 
c  in DIMACS:
 21959 -21960 -21961  0
c  -3 does not represent an automaton state.
c    -( b^{201, 1}_2 ∧  b^{201, 1}_1 ∧  b^{201, 1}_0 ∧ true) 
c  in CNF:
c    -b^{201, 1}_2 ∨ -b^{201, 1}_1 ∨ -b^{201, 1}_0 ∨ false 
c  in DIMACS:
-21959 -21960 -21961  0

c i = 2
c  -2+1 --> -1
c    ( b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧  p_402) -> ( b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0)
c  in CNF:
c    -b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨  b^{201, 3}_2
c    -b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_1
c    -b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨  b^{201, 3}_0
c  in DIMACS:
-21962 -21963  21964 -402  21965 0
-21962 -21963  21964 -402 -21966 0
-21962 -21963  21964 -402  21967 0

c  -1+1 --> 0
c    ( b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0 ∧  p_402) -> (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧ -b^{201, 3}_0)
c  in CNF:
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_2
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_1
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_0
c  in DIMACS:
-21962  21963 -21964 -402 -21965 0
-21962  21963 -21964 -402 -21966 0
-21962  21963 -21964 -402 -21967 0

c  0+1 --> 1
c    (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧  p_402) -> (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0)
c  in CNF:
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_2
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_1
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨  b^{201, 3}_0
c  in DIMACS:
 21962  21963  21964 -402 -21965 0
 21962  21963  21964 -402 -21966 0
 21962  21963  21964 -402  21967 0

c  1+1 --> 2
c    (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0 ∧  p_402) -> (-b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0)
c  in CNF:
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_2
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨  b^{201, 3}_1
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ -p_402 ∨ -b^{201, 3}_0
c  in DIMACS:
 21962  21963 -21964 -402 -21965 0
 21962  21963 -21964 -402  21966 0
 21962  21963 -21964 -402 -21967 0

c  2+1 --> break 
c    (-b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧  p_402) -> break
c  in CNF:
c     b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ -p_402 ∨ break
c  in DIMACS:
 21962 -21963  21964 -402 1162 0


c  2-1 --> 1
c    (-b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧ -p_402) -> (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0)
c  in CNF:
c     b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_2
c     b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_1
c     b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨  b^{201, 3}_0
c  in DIMACS:
 21962 -21963  21964  402 -21965 0
 21962 -21963  21964  402 -21966 0
 21962 -21963  21964  402  21967 0

c  1-1 --> 0
c    (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0 ∧ -p_402) -> (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧ -b^{201, 3}_0)
c  in CNF:
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_2
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_1
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_0
c  in DIMACS:
 21962  21963 -21964  402 -21965 0
 21962  21963 -21964  402 -21966 0
 21962  21963 -21964  402 -21967 0

c  0-1 --> -1
c    (-b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧ -p_402) -> ( b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0)
c  in CNF:
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨  b^{201, 3}_2
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_1
c     b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨  b^{201, 3}_0
c  in DIMACS:
 21962  21963  21964  402  21965 0
 21962  21963  21964  402 -21966 0
 21962  21963  21964  402  21967 0

c  -1-1 --> -2
c    ( b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧  b^{201, 2}_0 ∧ -p_402) -> ( b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0)
c  in CNF:
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨  b^{201, 3}_2
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨  b^{201, 3}_1
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨  p_402 ∨ -b^{201, 3}_0
c  in DIMACS:
-21962  21963 -21964  402  21965 0
-21962  21963 -21964  402  21966 0
-21962  21963 -21964  402 -21967 0

c  -2-1 --> break 
c    ( b^{201, 2}_2 ∧  b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧ -p_402) -> break
c  in CNF:
c    -b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨  b^{201, 2}_0 ∨  p_402 ∨ break
c  in DIMACS:
-21962 -21963  21964  402 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{201, 2}_2 ∧ -b^{201, 2}_1 ∧ -b^{201, 2}_0 ∧ true) 
c  in CNF:
c    -b^{201, 2}_2 ∨  b^{201, 2}_1 ∨  b^{201, 2}_0 ∨ false 
c  in DIMACS:
-21962  21963  21964  0

c  3 does not represent an automaton state.
c    -(-b^{201, 2}_2 ∧  b^{201, 2}_1 ∧  b^{201, 2}_0 ∧ true) 
c  in CNF:
c     b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ false 
c  in DIMACS:
 21962 -21963 -21964  0
c  -3 does not represent an automaton state.
c    -( b^{201, 2}_2 ∧  b^{201, 2}_1 ∧  b^{201, 2}_0 ∧ true) 
c  in CNF:
c    -b^{201, 2}_2 ∨ -b^{201, 2}_1 ∨ -b^{201, 2}_0 ∨ false 
c  in DIMACS:
-21962 -21963 -21964  0

c i = 3
c  -2+1 --> -1
c    ( b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧  p_603) -> ( b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0)
c  in CNF:
c    -b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨  b^{201, 4}_2
c    -b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_1
c    -b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨  b^{201, 4}_0
c  in DIMACS:
-21965 -21966  21967 -603  21968 0
-21965 -21966  21967 -603 -21969 0
-21965 -21966  21967 -603  21970 0

c  -1+1 --> 0
c    ( b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0 ∧  p_603) -> (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧ -b^{201, 4}_0)
c  in CNF:
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_2
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_1
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_0
c  in DIMACS:
-21965  21966 -21967 -603 -21968 0
-21965  21966 -21967 -603 -21969 0
-21965  21966 -21967 -603 -21970 0

c  0+1 --> 1
c    (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧  p_603) -> (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0)
c  in CNF:
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_2
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_1
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨  b^{201, 4}_0
c  in DIMACS:
 21965  21966  21967 -603 -21968 0
 21965  21966  21967 -603 -21969 0
 21965  21966  21967 -603  21970 0

c  1+1 --> 2
c    (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0 ∧  p_603) -> (-b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0)
c  in CNF:
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_2
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨  b^{201, 4}_1
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ -p_603 ∨ -b^{201, 4}_0
c  in DIMACS:
 21965  21966 -21967 -603 -21968 0
 21965  21966 -21967 -603  21969 0
 21965  21966 -21967 -603 -21970 0

c  2+1 --> break 
c    (-b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧  p_603) -> break
c  in CNF:
c     b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ -p_603 ∨ break
c  in DIMACS:
 21965 -21966  21967 -603 1162 0


c  2-1 --> 1
c    (-b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧ -p_603) -> (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0)
c  in CNF:
c     b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_2
c     b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_1
c     b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨  b^{201, 4}_0
c  in DIMACS:
 21965 -21966  21967  603 -21968 0
 21965 -21966  21967  603 -21969 0
 21965 -21966  21967  603  21970 0

c  1-1 --> 0
c    (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0 ∧ -p_603) -> (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧ -b^{201, 4}_0)
c  in CNF:
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_2
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_1
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_0
c  in DIMACS:
 21965  21966 -21967  603 -21968 0
 21965  21966 -21967  603 -21969 0
 21965  21966 -21967  603 -21970 0

c  0-1 --> -1
c    (-b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧ -p_603) -> ( b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0)
c  in CNF:
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨  b^{201, 4}_2
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_1
c     b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨  b^{201, 4}_0
c  in DIMACS:
 21965  21966  21967  603  21968 0
 21965  21966  21967  603 -21969 0
 21965  21966  21967  603  21970 0

c  -1-1 --> -2
c    ( b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧  b^{201, 3}_0 ∧ -p_603) -> ( b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0)
c  in CNF:
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨  b^{201, 4}_2
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨  b^{201, 4}_1
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨  p_603 ∨ -b^{201, 4}_0
c  in DIMACS:
-21965  21966 -21967  603  21968 0
-21965  21966 -21967  603  21969 0
-21965  21966 -21967  603 -21970 0

c  -2-1 --> break 
c    ( b^{201, 3}_2 ∧  b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧ -p_603) -> break
c  in CNF:
c    -b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨  b^{201, 3}_0 ∨  p_603 ∨ break
c  in DIMACS:
-21965 -21966  21967  603 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{201, 3}_2 ∧ -b^{201, 3}_1 ∧ -b^{201, 3}_0 ∧ true) 
c  in CNF:
c    -b^{201, 3}_2 ∨  b^{201, 3}_1 ∨  b^{201, 3}_0 ∨ false 
c  in DIMACS:
-21965  21966  21967  0

c  3 does not represent an automaton state.
c    -(-b^{201, 3}_2 ∧  b^{201, 3}_1 ∧  b^{201, 3}_0 ∧ true) 
c  in CNF:
c     b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ false 
c  in DIMACS:
 21965 -21966 -21967  0
c  -3 does not represent an automaton state.
c    -( b^{201, 3}_2 ∧  b^{201, 3}_1 ∧  b^{201, 3}_0 ∧ true) 
c  in CNF:
c    -b^{201, 3}_2 ∨ -b^{201, 3}_1 ∨ -b^{201, 3}_0 ∨ false 
c  in DIMACS:
-21965 -21966 -21967  0

c i = 4
c  -2+1 --> -1
c    ( b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧  p_804) -> ( b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0)
c  in CNF:
c    -b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨  b^{201, 5}_2
c    -b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_1
c    -b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨  b^{201, 5}_0
c  in DIMACS:
-21968 -21969  21970 -804  21971 0
-21968 -21969  21970 -804 -21972 0
-21968 -21969  21970 -804  21973 0

c  -1+1 --> 0
c    ( b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0 ∧  p_804) -> (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧ -b^{201, 5}_0)
c  in CNF:
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_2
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_1
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_0
c  in DIMACS:
-21968  21969 -21970 -804 -21971 0
-21968  21969 -21970 -804 -21972 0
-21968  21969 -21970 -804 -21973 0

c  0+1 --> 1
c    (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧  p_804) -> (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0)
c  in CNF:
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_2
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_1
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨  b^{201, 5}_0
c  in DIMACS:
 21968  21969  21970 -804 -21971 0
 21968  21969  21970 -804 -21972 0
 21968  21969  21970 -804  21973 0

c  1+1 --> 2
c    (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0 ∧  p_804) -> (-b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0)
c  in CNF:
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_2
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨  b^{201, 5}_1
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ -p_804 ∨ -b^{201, 5}_0
c  in DIMACS:
 21968  21969 -21970 -804 -21971 0
 21968  21969 -21970 -804  21972 0
 21968  21969 -21970 -804 -21973 0

c  2+1 --> break 
c    (-b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧  p_804) -> break
c  in CNF:
c     b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 21968 -21969  21970 -804 1162 0


c  2-1 --> 1
c    (-b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧ -p_804) -> (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0)
c  in CNF:
c     b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_2
c     b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_1
c     b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨  b^{201, 5}_0
c  in DIMACS:
 21968 -21969  21970  804 -21971 0
 21968 -21969  21970  804 -21972 0
 21968 -21969  21970  804  21973 0

c  1-1 --> 0
c    (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0 ∧ -p_804) -> (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧ -b^{201, 5}_0)
c  in CNF:
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_2
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_1
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_0
c  in DIMACS:
 21968  21969 -21970  804 -21971 0
 21968  21969 -21970  804 -21972 0
 21968  21969 -21970  804 -21973 0

c  0-1 --> -1
c    (-b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧ -p_804) -> ( b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0)
c  in CNF:
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨  b^{201, 5}_2
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_1
c     b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨  b^{201, 5}_0
c  in DIMACS:
 21968  21969  21970  804  21971 0
 21968  21969  21970  804 -21972 0
 21968  21969  21970  804  21973 0

c  -1-1 --> -2
c    ( b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧  b^{201, 4}_0 ∧ -p_804) -> ( b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0)
c  in CNF:
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨  b^{201, 5}_2
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨  b^{201, 5}_1
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨  p_804 ∨ -b^{201, 5}_0
c  in DIMACS:
-21968  21969 -21970  804  21971 0
-21968  21969 -21970  804  21972 0
-21968  21969 -21970  804 -21973 0

c  -2-1 --> break 
c    ( b^{201, 4}_2 ∧  b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨  b^{201, 4}_0 ∨  p_804 ∨ break
c  in DIMACS:
-21968 -21969  21970  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{201, 4}_2 ∧ -b^{201, 4}_1 ∧ -b^{201, 4}_0 ∧ true) 
c  in CNF:
c    -b^{201, 4}_2 ∨  b^{201, 4}_1 ∨  b^{201, 4}_0 ∨ false 
c  in DIMACS:
-21968  21969  21970  0

c  3 does not represent an automaton state.
c    -(-b^{201, 4}_2 ∧  b^{201, 4}_1 ∧  b^{201, 4}_0 ∧ true) 
c  in CNF:
c     b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ false 
c  in DIMACS:
 21968 -21969 -21970  0
c  -3 does not represent an automaton state.
c    -( b^{201, 4}_2 ∧  b^{201, 4}_1 ∧  b^{201, 4}_0 ∧ true) 
c  in CNF:
c    -b^{201, 4}_2 ∨ -b^{201, 4}_1 ∨ -b^{201, 4}_0 ∨ false 
c  in DIMACS:
-21968 -21969 -21970  0

c i = 5
c  -2+1 --> -1
c    ( b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧  p_1005) -> ( b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧  b^{201, 6}_0)
c  in CNF:
c    -b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨  b^{201, 6}_2
c    -b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_1
c    -b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨  b^{201, 6}_0
c  in DIMACS:
-21971 -21972  21973 -1005  21974 0
-21971 -21972  21973 -1005 -21975 0
-21971 -21972  21973 -1005  21976 0

c  -1+1 --> 0
c    ( b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0 ∧  p_1005) -> (-b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧ -b^{201, 6}_0)
c  in CNF:
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_2
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_1
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_0
c  in DIMACS:
-21971  21972 -21973 -1005 -21974 0
-21971  21972 -21973 -1005 -21975 0
-21971  21972 -21973 -1005 -21976 0

c  0+1 --> 1
c    (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧  p_1005) -> (-b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧  b^{201, 6}_0)
c  in CNF:
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_2
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_1
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨  b^{201, 6}_0
c  in DIMACS:
 21971  21972  21973 -1005 -21974 0
 21971  21972  21973 -1005 -21975 0
 21971  21972  21973 -1005  21976 0

c  1+1 --> 2
c    (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0 ∧  p_1005) -> (-b^{201, 6}_2 ∧  b^{201, 6}_1 ∧ -b^{201, 6}_0)
c  in CNF:
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_2
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨  b^{201, 6}_1
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ -p_1005 ∨ -b^{201, 6}_0
c  in DIMACS:
 21971  21972 -21973 -1005 -21974 0
 21971  21972 -21973 -1005  21975 0
 21971  21972 -21973 -1005 -21976 0

c  2+1 --> break 
c    (-b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 21971 -21972  21973 -1005 1162 0


c  2-1 --> 1
c    (-b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧ -p_1005) -> (-b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧  b^{201, 6}_0)
c  in CNF:
c     b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_2
c     b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_1
c     b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨  b^{201, 6}_0
c  in DIMACS:
 21971 -21972  21973  1005 -21974 0
 21971 -21972  21973  1005 -21975 0
 21971 -21972  21973  1005  21976 0

c  1-1 --> 0
c    (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0 ∧ -p_1005) -> (-b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧ -b^{201, 6}_0)
c  in CNF:
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_2
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_1
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_0
c  in DIMACS:
 21971  21972 -21973  1005 -21974 0
 21971  21972 -21973  1005 -21975 0
 21971  21972 -21973  1005 -21976 0

c  0-1 --> -1
c    (-b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧ -p_1005) -> ( b^{201, 6}_2 ∧ -b^{201, 6}_1 ∧  b^{201, 6}_0)
c  in CNF:
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨  b^{201, 6}_2
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_1
c     b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨  b^{201, 6}_0
c  in DIMACS:
 21971  21972  21973  1005  21974 0
 21971  21972  21973  1005 -21975 0
 21971  21972  21973  1005  21976 0

c  -1-1 --> -2
c    ( b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧  b^{201, 5}_0 ∧ -p_1005) -> ( b^{201, 6}_2 ∧  b^{201, 6}_1 ∧ -b^{201, 6}_0)
c  in CNF:
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨  b^{201, 6}_2
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨  b^{201, 6}_1
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨  p_1005 ∨ -b^{201, 6}_0
c  in DIMACS:
-21971  21972 -21973  1005  21974 0
-21971  21972 -21973  1005  21975 0
-21971  21972 -21973  1005 -21976 0

c  -2-1 --> break 
c    ( b^{201, 5}_2 ∧  b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨  b^{201, 5}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-21971 -21972  21973  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{201, 5}_2 ∧ -b^{201, 5}_1 ∧ -b^{201, 5}_0 ∧ true) 
c  in CNF:
c    -b^{201, 5}_2 ∨  b^{201, 5}_1 ∨  b^{201, 5}_0 ∨ false 
c  in DIMACS:
-21971  21972  21973  0

c  3 does not represent an automaton state.
c    -(-b^{201, 5}_2 ∧  b^{201, 5}_1 ∧  b^{201, 5}_0 ∧ true) 
c  in CNF:
c     b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ false 
c  in DIMACS:
 21971 -21972 -21973  0
c  -3 does not represent an automaton state.
c    -( b^{201, 5}_2 ∧  b^{201, 5}_1 ∧  b^{201, 5}_0 ∧ true) 
c  in CNF:
c    -b^{201, 5}_2 ∨ -b^{201, 5}_1 ∨ -b^{201, 5}_0 ∨ false 
c  in DIMACS:
-21971 -21972 -21973  0

c INIT for k = 202
c    -b^{202, 1}_2
c    -b^{202, 1}_1
c    -b^{202, 1}_0
c  in DIMACS:
-21977 0
-21978 0
-21979 0

c Transitions for k = 202
c i = 1
c  -2+1 --> -1
c    ( b^{202, 1}_2 ∧  b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧  p_202) -> ( b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0)
c  in CNF:
c    -b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨  b^{202, 2}_2
c    -b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_1
c    -b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨  b^{202, 2}_0
c  in DIMACS:
-21977 -21978  21979 -202  21980 0
-21977 -21978  21979 -202 -21981 0
-21977 -21978  21979 -202  21982 0

c  -1+1 --> 0
c    ( b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧  b^{202, 1}_0 ∧  p_202) -> (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧ -b^{202, 2}_0)
c  in CNF:
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_2
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_1
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_0
c  in DIMACS:
-21977  21978 -21979 -202 -21980 0
-21977  21978 -21979 -202 -21981 0
-21977  21978 -21979 -202 -21982 0

c  0+1 --> 1
c    (-b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧  p_202) -> (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0)
c  in CNF:
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_2
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_1
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨  b^{202, 2}_0
c  in DIMACS:
 21977  21978  21979 -202 -21980 0
 21977  21978  21979 -202 -21981 0
 21977  21978  21979 -202  21982 0

c  1+1 --> 2
c    (-b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧  b^{202, 1}_0 ∧  p_202) -> (-b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0)
c  in CNF:
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_2
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨  b^{202, 2}_1
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ -p_202 ∨ -b^{202, 2}_0
c  in DIMACS:
 21977  21978 -21979 -202 -21980 0
 21977  21978 -21979 -202  21981 0
 21977  21978 -21979 -202 -21982 0

c  2+1 --> break 
c    (-b^{202, 1}_2 ∧  b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧  p_202) -> break
c  in CNF:
c     b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ -p_202 ∨ break
c  in DIMACS:
 21977 -21978  21979 -202 1162 0


c  2-1 --> 1
c    (-b^{202, 1}_2 ∧  b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧ -p_202) -> (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0)
c  in CNF:
c     b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_2
c     b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_1
c     b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨  b^{202, 2}_0
c  in DIMACS:
 21977 -21978  21979  202 -21980 0
 21977 -21978  21979  202 -21981 0
 21977 -21978  21979  202  21982 0

c  1-1 --> 0
c    (-b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧  b^{202, 1}_0 ∧ -p_202) -> (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧ -b^{202, 2}_0)
c  in CNF:
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_2
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_1
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_0
c  in DIMACS:
 21977  21978 -21979  202 -21980 0
 21977  21978 -21979  202 -21981 0
 21977  21978 -21979  202 -21982 0

c  0-1 --> -1
c    (-b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧ -p_202) -> ( b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0)
c  in CNF:
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨  b^{202, 2}_2
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_1
c     b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨  b^{202, 2}_0
c  in DIMACS:
 21977  21978  21979  202  21980 0
 21977  21978  21979  202 -21981 0
 21977  21978  21979  202  21982 0

c  -1-1 --> -2
c    ( b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧  b^{202, 1}_0 ∧ -p_202) -> ( b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0)
c  in CNF:
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨  b^{202, 2}_2
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨  b^{202, 2}_1
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨  p_202 ∨ -b^{202, 2}_0
c  in DIMACS:
-21977  21978 -21979  202  21980 0
-21977  21978 -21979  202  21981 0
-21977  21978 -21979  202 -21982 0

c  -2-1 --> break 
c    ( b^{202, 1}_2 ∧  b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧ -p_202) -> break
c  in CNF:
c    -b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨  b^{202, 1}_0 ∨  p_202 ∨ break
c  in DIMACS:
-21977 -21978  21979  202 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{202, 1}_2 ∧ -b^{202, 1}_1 ∧ -b^{202, 1}_0 ∧ true) 
c  in CNF:
c    -b^{202, 1}_2 ∨  b^{202, 1}_1 ∨  b^{202, 1}_0 ∨ false 
c  in DIMACS:
-21977  21978  21979  0

c  3 does not represent an automaton state.
c    -(-b^{202, 1}_2 ∧  b^{202, 1}_1 ∧  b^{202, 1}_0 ∧ true) 
c  in CNF:
c     b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ false 
c  in DIMACS:
 21977 -21978 -21979  0
c  -3 does not represent an automaton state.
c    -( b^{202, 1}_2 ∧  b^{202, 1}_1 ∧  b^{202, 1}_0 ∧ true) 
c  in CNF:
c    -b^{202, 1}_2 ∨ -b^{202, 1}_1 ∨ -b^{202, 1}_0 ∨ false 
c  in DIMACS:
-21977 -21978 -21979  0

c i = 2
c  -2+1 --> -1
c    ( b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧  p_404) -> ( b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0)
c  in CNF:
c    -b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨  b^{202, 3}_2
c    -b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_1
c    -b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨  b^{202, 3}_0
c  in DIMACS:
-21980 -21981  21982 -404  21983 0
-21980 -21981  21982 -404 -21984 0
-21980 -21981  21982 -404  21985 0

c  -1+1 --> 0
c    ( b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0 ∧  p_404) -> (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧ -b^{202, 3}_0)
c  in CNF:
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_2
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_1
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_0
c  in DIMACS:
-21980  21981 -21982 -404 -21983 0
-21980  21981 -21982 -404 -21984 0
-21980  21981 -21982 -404 -21985 0

c  0+1 --> 1
c    (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧  p_404) -> (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0)
c  in CNF:
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_2
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_1
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨  b^{202, 3}_0
c  in DIMACS:
 21980  21981  21982 -404 -21983 0
 21980  21981  21982 -404 -21984 0
 21980  21981  21982 -404  21985 0

c  1+1 --> 2
c    (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0 ∧  p_404) -> (-b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0)
c  in CNF:
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_2
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨  b^{202, 3}_1
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ -p_404 ∨ -b^{202, 3}_0
c  in DIMACS:
 21980  21981 -21982 -404 -21983 0
 21980  21981 -21982 -404  21984 0
 21980  21981 -21982 -404 -21985 0

c  2+1 --> break 
c    (-b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧  p_404) -> break
c  in CNF:
c     b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ -p_404 ∨ break
c  in DIMACS:
 21980 -21981  21982 -404 1162 0


c  2-1 --> 1
c    (-b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧ -p_404) -> (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0)
c  in CNF:
c     b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_2
c     b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_1
c     b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨  b^{202, 3}_0
c  in DIMACS:
 21980 -21981  21982  404 -21983 0
 21980 -21981  21982  404 -21984 0
 21980 -21981  21982  404  21985 0

c  1-1 --> 0
c    (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0 ∧ -p_404) -> (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧ -b^{202, 3}_0)
c  in CNF:
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_2
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_1
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_0
c  in DIMACS:
 21980  21981 -21982  404 -21983 0
 21980  21981 -21982  404 -21984 0
 21980  21981 -21982  404 -21985 0

c  0-1 --> -1
c    (-b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧ -p_404) -> ( b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0)
c  in CNF:
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨  b^{202, 3}_2
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_1
c     b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨  b^{202, 3}_0
c  in DIMACS:
 21980  21981  21982  404  21983 0
 21980  21981  21982  404 -21984 0
 21980  21981  21982  404  21985 0

c  -1-1 --> -2
c    ( b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧  b^{202, 2}_0 ∧ -p_404) -> ( b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0)
c  in CNF:
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨  b^{202, 3}_2
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨  b^{202, 3}_1
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨  p_404 ∨ -b^{202, 3}_0
c  in DIMACS:
-21980  21981 -21982  404  21983 0
-21980  21981 -21982  404  21984 0
-21980  21981 -21982  404 -21985 0

c  -2-1 --> break 
c    ( b^{202, 2}_2 ∧  b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧ -p_404) -> break
c  in CNF:
c    -b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨  b^{202, 2}_0 ∨  p_404 ∨ break
c  in DIMACS:
-21980 -21981  21982  404 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{202, 2}_2 ∧ -b^{202, 2}_1 ∧ -b^{202, 2}_0 ∧ true) 
c  in CNF:
c    -b^{202, 2}_2 ∨  b^{202, 2}_1 ∨  b^{202, 2}_0 ∨ false 
c  in DIMACS:
-21980  21981  21982  0

c  3 does not represent an automaton state.
c    -(-b^{202, 2}_2 ∧  b^{202, 2}_1 ∧  b^{202, 2}_0 ∧ true) 
c  in CNF:
c     b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ false 
c  in DIMACS:
 21980 -21981 -21982  0
c  -3 does not represent an automaton state.
c    -( b^{202, 2}_2 ∧  b^{202, 2}_1 ∧  b^{202, 2}_0 ∧ true) 
c  in CNF:
c    -b^{202, 2}_2 ∨ -b^{202, 2}_1 ∨ -b^{202, 2}_0 ∨ false 
c  in DIMACS:
-21980 -21981 -21982  0

c i = 3
c  -2+1 --> -1
c    ( b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧  p_606) -> ( b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0)
c  in CNF:
c    -b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨  b^{202, 4}_2
c    -b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_1
c    -b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨  b^{202, 4}_0
c  in DIMACS:
-21983 -21984  21985 -606  21986 0
-21983 -21984  21985 -606 -21987 0
-21983 -21984  21985 -606  21988 0

c  -1+1 --> 0
c    ( b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0 ∧  p_606) -> (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧ -b^{202, 4}_0)
c  in CNF:
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_2
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_1
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_0
c  in DIMACS:
-21983  21984 -21985 -606 -21986 0
-21983  21984 -21985 -606 -21987 0
-21983  21984 -21985 -606 -21988 0

c  0+1 --> 1
c    (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧  p_606) -> (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0)
c  in CNF:
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_2
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_1
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨  b^{202, 4}_0
c  in DIMACS:
 21983  21984  21985 -606 -21986 0
 21983  21984  21985 -606 -21987 0
 21983  21984  21985 -606  21988 0

c  1+1 --> 2
c    (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0 ∧  p_606) -> (-b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0)
c  in CNF:
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_2
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨  b^{202, 4}_1
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ -p_606 ∨ -b^{202, 4}_0
c  in DIMACS:
 21983  21984 -21985 -606 -21986 0
 21983  21984 -21985 -606  21987 0
 21983  21984 -21985 -606 -21988 0

c  2+1 --> break 
c    (-b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧  p_606) -> break
c  in CNF:
c     b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 21983 -21984  21985 -606 1162 0


c  2-1 --> 1
c    (-b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧ -p_606) -> (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0)
c  in CNF:
c     b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_2
c     b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_1
c     b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨  b^{202, 4}_0
c  in DIMACS:
 21983 -21984  21985  606 -21986 0
 21983 -21984  21985  606 -21987 0
 21983 -21984  21985  606  21988 0

c  1-1 --> 0
c    (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0 ∧ -p_606) -> (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧ -b^{202, 4}_0)
c  in CNF:
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_2
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_1
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_0
c  in DIMACS:
 21983  21984 -21985  606 -21986 0
 21983  21984 -21985  606 -21987 0
 21983  21984 -21985  606 -21988 0

c  0-1 --> -1
c    (-b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧ -p_606) -> ( b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0)
c  in CNF:
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨  b^{202, 4}_2
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_1
c     b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨  b^{202, 4}_0
c  in DIMACS:
 21983  21984  21985  606  21986 0
 21983  21984  21985  606 -21987 0
 21983  21984  21985  606  21988 0

c  -1-1 --> -2
c    ( b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧  b^{202, 3}_0 ∧ -p_606) -> ( b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0)
c  in CNF:
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨  b^{202, 4}_2
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨  b^{202, 4}_1
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨  p_606 ∨ -b^{202, 4}_0
c  in DIMACS:
-21983  21984 -21985  606  21986 0
-21983  21984 -21985  606  21987 0
-21983  21984 -21985  606 -21988 0

c  -2-1 --> break 
c    ( b^{202, 3}_2 ∧  b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨  b^{202, 3}_0 ∨  p_606 ∨ break
c  in DIMACS:
-21983 -21984  21985  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{202, 3}_2 ∧ -b^{202, 3}_1 ∧ -b^{202, 3}_0 ∧ true) 
c  in CNF:
c    -b^{202, 3}_2 ∨  b^{202, 3}_1 ∨  b^{202, 3}_0 ∨ false 
c  in DIMACS:
-21983  21984  21985  0

c  3 does not represent an automaton state.
c    -(-b^{202, 3}_2 ∧  b^{202, 3}_1 ∧  b^{202, 3}_0 ∧ true) 
c  in CNF:
c     b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ false 
c  in DIMACS:
 21983 -21984 -21985  0
c  -3 does not represent an automaton state.
c    -( b^{202, 3}_2 ∧  b^{202, 3}_1 ∧  b^{202, 3}_0 ∧ true) 
c  in CNF:
c    -b^{202, 3}_2 ∨ -b^{202, 3}_1 ∨ -b^{202, 3}_0 ∨ false 
c  in DIMACS:
-21983 -21984 -21985  0

c i = 4
c  -2+1 --> -1
c    ( b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧  p_808) -> ( b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0)
c  in CNF:
c    -b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨  b^{202, 5}_2
c    -b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_1
c    -b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨  b^{202, 5}_0
c  in DIMACS:
-21986 -21987  21988 -808  21989 0
-21986 -21987  21988 -808 -21990 0
-21986 -21987  21988 -808  21991 0

c  -1+1 --> 0
c    ( b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0 ∧  p_808) -> (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧ -b^{202, 5}_0)
c  in CNF:
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_2
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_1
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_0
c  in DIMACS:
-21986  21987 -21988 -808 -21989 0
-21986  21987 -21988 -808 -21990 0
-21986  21987 -21988 -808 -21991 0

c  0+1 --> 1
c    (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧  p_808) -> (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0)
c  in CNF:
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_2
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_1
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨  b^{202, 5}_0
c  in DIMACS:
 21986  21987  21988 -808 -21989 0
 21986  21987  21988 -808 -21990 0
 21986  21987  21988 -808  21991 0

c  1+1 --> 2
c    (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0 ∧  p_808) -> (-b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0)
c  in CNF:
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_2
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨  b^{202, 5}_1
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ -p_808 ∨ -b^{202, 5}_0
c  in DIMACS:
 21986  21987 -21988 -808 -21989 0
 21986  21987 -21988 -808  21990 0
 21986  21987 -21988 -808 -21991 0

c  2+1 --> break 
c    (-b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧  p_808) -> break
c  in CNF:
c     b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ -p_808 ∨ break
c  in DIMACS:
 21986 -21987  21988 -808 1162 0


c  2-1 --> 1
c    (-b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧ -p_808) -> (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0)
c  in CNF:
c     b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_2
c     b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_1
c     b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨  b^{202, 5}_0
c  in DIMACS:
 21986 -21987  21988  808 -21989 0
 21986 -21987  21988  808 -21990 0
 21986 -21987  21988  808  21991 0

c  1-1 --> 0
c    (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0 ∧ -p_808) -> (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧ -b^{202, 5}_0)
c  in CNF:
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_2
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_1
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_0
c  in DIMACS:
 21986  21987 -21988  808 -21989 0
 21986  21987 -21988  808 -21990 0
 21986  21987 -21988  808 -21991 0

c  0-1 --> -1
c    (-b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧ -p_808) -> ( b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0)
c  in CNF:
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨  b^{202, 5}_2
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_1
c     b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨  b^{202, 5}_0
c  in DIMACS:
 21986  21987  21988  808  21989 0
 21986  21987  21988  808 -21990 0
 21986  21987  21988  808  21991 0

c  -1-1 --> -2
c    ( b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧  b^{202, 4}_0 ∧ -p_808) -> ( b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0)
c  in CNF:
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨  b^{202, 5}_2
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨  b^{202, 5}_1
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨  p_808 ∨ -b^{202, 5}_0
c  in DIMACS:
-21986  21987 -21988  808  21989 0
-21986  21987 -21988  808  21990 0
-21986  21987 -21988  808 -21991 0

c  -2-1 --> break 
c    ( b^{202, 4}_2 ∧  b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧ -p_808) -> break
c  in CNF:
c    -b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨  b^{202, 4}_0 ∨  p_808 ∨ break
c  in DIMACS:
-21986 -21987  21988  808 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{202, 4}_2 ∧ -b^{202, 4}_1 ∧ -b^{202, 4}_0 ∧ true) 
c  in CNF:
c    -b^{202, 4}_2 ∨  b^{202, 4}_1 ∨  b^{202, 4}_0 ∨ false 
c  in DIMACS:
-21986  21987  21988  0

c  3 does not represent an automaton state.
c    -(-b^{202, 4}_2 ∧  b^{202, 4}_1 ∧  b^{202, 4}_0 ∧ true) 
c  in CNF:
c     b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ false 
c  in DIMACS:
 21986 -21987 -21988  0
c  -3 does not represent an automaton state.
c    -( b^{202, 4}_2 ∧  b^{202, 4}_1 ∧  b^{202, 4}_0 ∧ true) 
c  in CNF:
c    -b^{202, 4}_2 ∨ -b^{202, 4}_1 ∨ -b^{202, 4}_0 ∨ false 
c  in DIMACS:
-21986 -21987 -21988  0

c i = 5
c  -2+1 --> -1
c    ( b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧  p_1010) -> ( b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧  b^{202, 6}_0)
c  in CNF:
c    -b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨  b^{202, 6}_2
c    -b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_1
c    -b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨  b^{202, 6}_0
c  in DIMACS:
-21989 -21990  21991 -1010  21992 0
-21989 -21990  21991 -1010 -21993 0
-21989 -21990  21991 -1010  21994 0

c  -1+1 --> 0
c    ( b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0 ∧  p_1010) -> (-b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧ -b^{202, 6}_0)
c  in CNF:
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_2
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_1
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_0
c  in DIMACS:
-21989  21990 -21991 -1010 -21992 0
-21989  21990 -21991 -1010 -21993 0
-21989  21990 -21991 -1010 -21994 0

c  0+1 --> 1
c    (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧  p_1010) -> (-b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧  b^{202, 6}_0)
c  in CNF:
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_2
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_1
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨  b^{202, 6}_0
c  in DIMACS:
 21989  21990  21991 -1010 -21992 0
 21989  21990  21991 -1010 -21993 0
 21989  21990  21991 -1010  21994 0

c  1+1 --> 2
c    (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0 ∧  p_1010) -> (-b^{202, 6}_2 ∧  b^{202, 6}_1 ∧ -b^{202, 6}_0)
c  in CNF:
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_2
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨  b^{202, 6}_1
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ -p_1010 ∨ -b^{202, 6}_0
c  in DIMACS:
 21989  21990 -21991 -1010 -21992 0
 21989  21990 -21991 -1010  21993 0
 21989  21990 -21991 -1010 -21994 0

c  2+1 --> break 
c    (-b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧  p_1010) -> break
c  in CNF:
c     b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ -p_1010 ∨ break
c  in DIMACS:
 21989 -21990  21991 -1010 1162 0


c  2-1 --> 1
c    (-b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧ -p_1010) -> (-b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧  b^{202, 6}_0)
c  in CNF:
c     b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_2
c     b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_1
c     b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨  b^{202, 6}_0
c  in DIMACS:
 21989 -21990  21991  1010 -21992 0
 21989 -21990  21991  1010 -21993 0
 21989 -21990  21991  1010  21994 0

c  1-1 --> 0
c    (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0 ∧ -p_1010) -> (-b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧ -b^{202, 6}_0)
c  in CNF:
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_2
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_1
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_0
c  in DIMACS:
 21989  21990 -21991  1010 -21992 0
 21989  21990 -21991  1010 -21993 0
 21989  21990 -21991  1010 -21994 0

c  0-1 --> -1
c    (-b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧ -p_1010) -> ( b^{202, 6}_2 ∧ -b^{202, 6}_1 ∧  b^{202, 6}_0)
c  in CNF:
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨  b^{202, 6}_2
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_1
c     b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨  b^{202, 6}_0
c  in DIMACS:
 21989  21990  21991  1010  21992 0
 21989  21990  21991  1010 -21993 0
 21989  21990  21991  1010  21994 0

c  -1-1 --> -2
c    ( b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧  b^{202, 5}_0 ∧ -p_1010) -> ( b^{202, 6}_2 ∧  b^{202, 6}_1 ∧ -b^{202, 6}_0)
c  in CNF:
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨  b^{202, 6}_2
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨  b^{202, 6}_1
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨  p_1010 ∨ -b^{202, 6}_0
c  in DIMACS:
-21989  21990 -21991  1010  21992 0
-21989  21990 -21991  1010  21993 0
-21989  21990 -21991  1010 -21994 0

c  -2-1 --> break 
c    ( b^{202, 5}_2 ∧  b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧ -p_1010) -> break
c  in CNF:
c    -b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨  b^{202, 5}_0 ∨  p_1010 ∨ break
c  in DIMACS:
-21989 -21990  21991  1010 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{202, 5}_2 ∧ -b^{202, 5}_1 ∧ -b^{202, 5}_0 ∧ true) 
c  in CNF:
c    -b^{202, 5}_2 ∨  b^{202, 5}_1 ∨  b^{202, 5}_0 ∨ false 
c  in DIMACS:
-21989  21990  21991  0

c  3 does not represent an automaton state.
c    -(-b^{202, 5}_2 ∧  b^{202, 5}_1 ∧  b^{202, 5}_0 ∧ true) 
c  in CNF:
c     b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ false 
c  in DIMACS:
 21989 -21990 -21991  0
c  -3 does not represent an automaton state.
c    -( b^{202, 5}_2 ∧  b^{202, 5}_1 ∧  b^{202, 5}_0 ∧ true) 
c  in CNF:
c    -b^{202, 5}_2 ∨ -b^{202, 5}_1 ∨ -b^{202, 5}_0 ∨ false 
c  in DIMACS:
-21989 -21990 -21991  0

c INIT for k = 203
c    -b^{203, 1}_2
c    -b^{203, 1}_1
c    -b^{203, 1}_0
c  in DIMACS:
-21995 0
-21996 0
-21997 0

c Transitions for k = 203
c i = 1
c  -2+1 --> -1
c    ( b^{203, 1}_2 ∧  b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧  p_203) -> ( b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0)
c  in CNF:
c    -b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨  b^{203, 2}_2
c    -b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_1
c    -b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨  b^{203, 2}_0
c  in DIMACS:
-21995 -21996  21997 -203  21998 0
-21995 -21996  21997 -203 -21999 0
-21995 -21996  21997 -203  22000 0

c  -1+1 --> 0
c    ( b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧  b^{203, 1}_0 ∧  p_203) -> (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧ -b^{203, 2}_0)
c  in CNF:
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_2
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_1
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_0
c  in DIMACS:
-21995  21996 -21997 -203 -21998 0
-21995  21996 -21997 -203 -21999 0
-21995  21996 -21997 -203 -22000 0

c  0+1 --> 1
c    (-b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧  p_203) -> (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0)
c  in CNF:
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_2
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_1
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨  b^{203, 2}_0
c  in DIMACS:
 21995  21996  21997 -203 -21998 0
 21995  21996  21997 -203 -21999 0
 21995  21996  21997 -203  22000 0

c  1+1 --> 2
c    (-b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧  b^{203, 1}_0 ∧  p_203) -> (-b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0)
c  in CNF:
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_2
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨  b^{203, 2}_1
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ -p_203 ∨ -b^{203, 2}_0
c  in DIMACS:
 21995  21996 -21997 -203 -21998 0
 21995  21996 -21997 -203  21999 0
 21995  21996 -21997 -203 -22000 0

c  2+1 --> break 
c    (-b^{203, 1}_2 ∧  b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧  p_203) -> break
c  in CNF:
c     b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ -p_203 ∨ break
c  in DIMACS:
 21995 -21996  21997 -203 1162 0


c  2-1 --> 1
c    (-b^{203, 1}_2 ∧  b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧ -p_203) -> (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0)
c  in CNF:
c     b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_2
c     b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_1
c     b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨  b^{203, 2}_0
c  in DIMACS:
 21995 -21996  21997  203 -21998 0
 21995 -21996  21997  203 -21999 0
 21995 -21996  21997  203  22000 0

c  1-1 --> 0
c    (-b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧  b^{203, 1}_0 ∧ -p_203) -> (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧ -b^{203, 2}_0)
c  in CNF:
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_2
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_1
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_0
c  in DIMACS:
 21995  21996 -21997  203 -21998 0
 21995  21996 -21997  203 -21999 0
 21995  21996 -21997  203 -22000 0

c  0-1 --> -1
c    (-b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧ -p_203) -> ( b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0)
c  in CNF:
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨  b^{203, 2}_2
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_1
c     b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨  b^{203, 2}_0
c  in DIMACS:
 21995  21996  21997  203  21998 0
 21995  21996  21997  203 -21999 0
 21995  21996  21997  203  22000 0

c  -1-1 --> -2
c    ( b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧  b^{203, 1}_0 ∧ -p_203) -> ( b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0)
c  in CNF:
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨  b^{203, 2}_2
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨  b^{203, 2}_1
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨  p_203 ∨ -b^{203, 2}_0
c  in DIMACS:
-21995  21996 -21997  203  21998 0
-21995  21996 -21997  203  21999 0
-21995  21996 -21997  203 -22000 0

c  -2-1 --> break 
c    ( b^{203, 1}_2 ∧  b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧ -p_203) -> break
c  in CNF:
c    -b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨  b^{203, 1}_0 ∨  p_203 ∨ break
c  in DIMACS:
-21995 -21996  21997  203 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{203, 1}_2 ∧ -b^{203, 1}_1 ∧ -b^{203, 1}_0 ∧ true) 
c  in CNF:
c    -b^{203, 1}_2 ∨  b^{203, 1}_1 ∨  b^{203, 1}_0 ∨ false 
c  in DIMACS:
-21995  21996  21997  0

c  3 does not represent an automaton state.
c    -(-b^{203, 1}_2 ∧  b^{203, 1}_1 ∧  b^{203, 1}_0 ∧ true) 
c  in CNF:
c     b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ false 
c  in DIMACS:
 21995 -21996 -21997  0
c  -3 does not represent an automaton state.
c    -( b^{203, 1}_2 ∧  b^{203, 1}_1 ∧  b^{203, 1}_0 ∧ true) 
c  in CNF:
c    -b^{203, 1}_2 ∨ -b^{203, 1}_1 ∨ -b^{203, 1}_0 ∨ false 
c  in DIMACS:
-21995 -21996 -21997  0

c i = 2
c  -2+1 --> -1
c    ( b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧  p_406) -> ( b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0)
c  in CNF:
c    -b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨  b^{203, 3}_2
c    -b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_1
c    -b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨  b^{203, 3}_0
c  in DIMACS:
-21998 -21999  22000 -406  22001 0
-21998 -21999  22000 -406 -22002 0
-21998 -21999  22000 -406  22003 0

c  -1+1 --> 0
c    ( b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0 ∧  p_406) -> (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧ -b^{203, 3}_0)
c  in CNF:
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_2
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_1
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_0
c  in DIMACS:
-21998  21999 -22000 -406 -22001 0
-21998  21999 -22000 -406 -22002 0
-21998  21999 -22000 -406 -22003 0

c  0+1 --> 1
c    (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧  p_406) -> (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0)
c  in CNF:
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_2
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_1
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨  b^{203, 3}_0
c  in DIMACS:
 21998  21999  22000 -406 -22001 0
 21998  21999  22000 -406 -22002 0
 21998  21999  22000 -406  22003 0

c  1+1 --> 2
c    (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0 ∧  p_406) -> (-b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0)
c  in CNF:
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_2
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨  b^{203, 3}_1
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ -p_406 ∨ -b^{203, 3}_0
c  in DIMACS:
 21998  21999 -22000 -406 -22001 0
 21998  21999 -22000 -406  22002 0
 21998  21999 -22000 -406 -22003 0

c  2+1 --> break 
c    (-b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧  p_406) -> break
c  in CNF:
c     b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ -p_406 ∨ break
c  in DIMACS:
 21998 -21999  22000 -406 1162 0


c  2-1 --> 1
c    (-b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧ -p_406) -> (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0)
c  in CNF:
c     b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_2
c     b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_1
c     b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨  b^{203, 3}_0
c  in DIMACS:
 21998 -21999  22000  406 -22001 0
 21998 -21999  22000  406 -22002 0
 21998 -21999  22000  406  22003 0

c  1-1 --> 0
c    (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0 ∧ -p_406) -> (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧ -b^{203, 3}_0)
c  in CNF:
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_2
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_1
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_0
c  in DIMACS:
 21998  21999 -22000  406 -22001 0
 21998  21999 -22000  406 -22002 0
 21998  21999 -22000  406 -22003 0

c  0-1 --> -1
c    (-b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧ -p_406) -> ( b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0)
c  in CNF:
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨  b^{203, 3}_2
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_1
c     b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨  b^{203, 3}_0
c  in DIMACS:
 21998  21999  22000  406  22001 0
 21998  21999  22000  406 -22002 0
 21998  21999  22000  406  22003 0

c  -1-1 --> -2
c    ( b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧  b^{203, 2}_0 ∧ -p_406) -> ( b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0)
c  in CNF:
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨  b^{203, 3}_2
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨  b^{203, 3}_1
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨  p_406 ∨ -b^{203, 3}_0
c  in DIMACS:
-21998  21999 -22000  406  22001 0
-21998  21999 -22000  406  22002 0
-21998  21999 -22000  406 -22003 0

c  -2-1 --> break 
c    ( b^{203, 2}_2 ∧  b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧ -p_406) -> break
c  in CNF:
c    -b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨  b^{203, 2}_0 ∨  p_406 ∨ break
c  in DIMACS:
-21998 -21999  22000  406 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{203, 2}_2 ∧ -b^{203, 2}_1 ∧ -b^{203, 2}_0 ∧ true) 
c  in CNF:
c    -b^{203, 2}_2 ∨  b^{203, 2}_1 ∨  b^{203, 2}_0 ∨ false 
c  in DIMACS:
-21998  21999  22000  0

c  3 does not represent an automaton state.
c    -(-b^{203, 2}_2 ∧  b^{203, 2}_1 ∧  b^{203, 2}_0 ∧ true) 
c  in CNF:
c     b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ false 
c  in DIMACS:
 21998 -21999 -22000  0
c  -3 does not represent an automaton state.
c    -( b^{203, 2}_2 ∧  b^{203, 2}_1 ∧  b^{203, 2}_0 ∧ true) 
c  in CNF:
c    -b^{203, 2}_2 ∨ -b^{203, 2}_1 ∨ -b^{203, 2}_0 ∨ false 
c  in DIMACS:
-21998 -21999 -22000  0

c i = 3
c  -2+1 --> -1
c    ( b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧  p_609) -> ( b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0)
c  in CNF:
c    -b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨  b^{203, 4}_2
c    -b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_1
c    -b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨  b^{203, 4}_0
c  in DIMACS:
-22001 -22002  22003 -609  22004 0
-22001 -22002  22003 -609 -22005 0
-22001 -22002  22003 -609  22006 0

c  -1+1 --> 0
c    ( b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0 ∧  p_609) -> (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧ -b^{203, 4}_0)
c  in CNF:
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_2
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_1
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_0
c  in DIMACS:
-22001  22002 -22003 -609 -22004 0
-22001  22002 -22003 -609 -22005 0
-22001  22002 -22003 -609 -22006 0

c  0+1 --> 1
c    (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧  p_609) -> (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0)
c  in CNF:
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_2
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_1
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨  b^{203, 4}_0
c  in DIMACS:
 22001  22002  22003 -609 -22004 0
 22001  22002  22003 -609 -22005 0
 22001  22002  22003 -609  22006 0

c  1+1 --> 2
c    (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0 ∧  p_609) -> (-b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0)
c  in CNF:
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_2
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨  b^{203, 4}_1
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ -p_609 ∨ -b^{203, 4}_0
c  in DIMACS:
 22001  22002 -22003 -609 -22004 0
 22001  22002 -22003 -609  22005 0
 22001  22002 -22003 -609 -22006 0

c  2+1 --> break 
c    (-b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧  p_609) -> break
c  in CNF:
c     b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ -p_609 ∨ break
c  in DIMACS:
 22001 -22002  22003 -609 1162 0


c  2-1 --> 1
c    (-b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧ -p_609) -> (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0)
c  in CNF:
c     b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_2
c     b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_1
c     b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨  b^{203, 4}_0
c  in DIMACS:
 22001 -22002  22003  609 -22004 0
 22001 -22002  22003  609 -22005 0
 22001 -22002  22003  609  22006 0

c  1-1 --> 0
c    (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0 ∧ -p_609) -> (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧ -b^{203, 4}_0)
c  in CNF:
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_2
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_1
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_0
c  in DIMACS:
 22001  22002 -22003  609 -22004 0
 22001  22002 -22003  609 -22005 0
 22001  22002 -22003  609 -22006 0

c  0-1 --> -1
c    (-b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧ -p_609) -> ( b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0)
c  in CNF:
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨  b^{203, 4}_2
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_1
c     b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨  b^{203, 4}_0
c  in DIMACS:
 22001  22002  22003  609  22004 0
 22001  22002  22003  609 -22005 0
 22001  22002  22003  609  22006 0

c  -1-1 --> -2
c    ( b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧  b^{203, 3}_0 ∧ -p_609) -> ( b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0)
c  in CNF:
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨  b^{203, 4}_2
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨  b^{203, 4}_1
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨  p_609 ∨ -b^{203, 4}_0
c  in DIMACS:
-22001  22002 -22003  609  22004 0
-22001  22002 -22003  609  22005 0
-22001  22002 -22003  609 -22006 0

c  -2-1 --> break 
c    ( b^{203, 3}_2 ∧  b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧ -p_609) -> break
c  in CNF:
c    -b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨  b^{203, 3}_0 ∨  p_609 ∨ break
c  in DIMACS:
-22001 -22002  22003  609 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{203, 3}_2 ∧ -b^{203, 3}_1 ∧ -b^{203, 3}_0 ∧ true) 
c  in CNF:
c    -b^{203, 3}_2 ∨  b^{203, 3}_1 ∨  b^{203, 3}_0 ∨ false 
c  in DIMACS:
-22001  22002  22003  0

c  3 does not represent an automaton state.
c    -(-b^{203, 3}_2 ∧  b^{203, 3}_1 ∧  b^{203, 3}_0 ∧ true) 
c  in CNF:
c     b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ false 
c  in DIMACS:
 22001 -22002 -22003  0
c  -3 does not represent an automaton state.
c    -( b^{203, 3}_2 ∧  b^{203, 3}_1 ∧  b^{203, 3}_0 ∧ true) 
c  in CNF:
c    -b^{203, 3}_2 ∨ -b^{203, 3}_1 ∨ -b^{203, 3}_0 ∨ false 
c  in DIMACS:
-22001 -22002 -22003  0

c i = 4
c  -2+1 --> -1
c    ( b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧  p_812) -> ( b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0)
c  in CNF:
c    -b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨  b^{203, 5}_2
c    -b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_1
c    -b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨  b^{203, 5}_0
c  in DIMACS:
-22004 -22005  22006 -812  22007 0
-22004 -22005  22006 -812 -22008 0
-22004 -22005  22006 -812  22009 0

c  -1+1 --> 0
c    ( b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0 ∧  p_812) -> (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧ -b^{203, 5}_0)
c  in CNF:
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_2
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_1
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_0
c  in DIMACS:
-22004  22005 -22006 -812 -22007 0
-22004  22005 -22006 -812 -22008 0
-22004  22005 -22006 -812 -22009 0

c  0+1 --> 1
c    (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧  p_812) -> (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0)
c  in CNF:
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_2
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_1
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨  b^{203, 5}_0
c  in DIMACS:
 22004  22005  22006 -812 -22007 0
 22004  22005  22006 -812 -22008 0
 22004  22005  22006 -812  22009 0

c  1+1 --> 2
c    (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0 ∧  p_812) -> (-b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0)
c  in CNF:
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_2
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨  b^{203, 5}_1
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ -p_812 ∨ -b^{203, 5}_0
c  in DIMACS:
 22004  22005 -22006 -812 -22007 0
 22004  22005 -22006 -812  22008 0
 22004  22005 -22006 -812 -22009 0

c  2+1 --> break 
c    (-b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧  p_812) -> break
c  in CNF:
c     b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ -p_812 ∨ break
c  in DIMACS:
 22004 -22005  22006 -812 1162 0


c  2-1 --> 1
c    (-b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧ -p_812) -> (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0)
c  in CNF:
c     b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_2
c     b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_1
c     b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨  b^{203, 5}_0
c  in DIMACS:
 22004 -22005  22006  812 -22007 0
 22004 -22005  22006  812 -22008 0
 22004 -22005  22006  812  22009 0

c  1-1 --> 0
c    (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0 ∧ -p_812) -> (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧ -b^{203, 5}_0)
c  in CNF:
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_2
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_1
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_0
c  in DIMACS:
 22004  22005 -22006  812 -22007 0
 22004  22005 -22006  812 -22008 0
 22004  22005 -22006  812 -22009 0

c  0-1 --> -1
c    (-b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧ -p_812) -> ( b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0)
c  in CNF:
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨  b^{203, 5}_2
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_1
c     b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨  b^{203, 5}_0
c  in DIMACS:
 22004  22005  22006  812  22007 0
 22004  22005  22006  812 -22008 0
 22004  22005  22006  812  22009 0

c  -1-1 --> -2
c    ( b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧  b^{203, 4}_0 ∧ -p_812) -> ( b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0)
c  in CNF:
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨  b^{203, 5}_2
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨  b^{203, 5}_1
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨  p_812 ∨ -b^{203, 5}_0
c  in DIMACS:
-22004  22005 -22006  812  22007 0
-22004  22005 -22006  812  22008 0
-22004  22005 -22006  812 -22009 0

c  -2-1 --> break 
c    ( b^{203, 4}_2 ∧  b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧ -p_812) -> break
c  in CNF:
c    -b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨  b^{203, 4}_0 ∨  p_812 ∨ break
c  in DIMACS:
-22004 -22005  22006  812 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{203, 4}_2 ∧ -b^{203, 4}_1 ∧ -b^{203, 4}_0 ∧ true) 
c  in CNF:
c    -b^{203, 4}_2 ∨  b^{203, 4}_1 ∨  b^{203, 4}_0 ∨ false 
c  in DIMACS:
-22004  22005  22006  0

c  3 does not represent an automaton state.
c    -(-b^{203, 4}_2 ∧  b^{203, 4}_1 ∧  b^{203, 4}_0 ∧ true) 
c  in CNF:
c     b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ false 
c  in DIMACS:
 22004 -22005 -22006  0
c  -3 does not represent an automaton state.
c    -( b^{203, 4}_2 ∧  b^{203, 4}_1 ∧  b^{203, 4}_0 ∧ true) 
c  in CNF:
c    -b^{203, 4}_2 ∨ -b^{203, 4}_1 ∨ -b^{203, 4}_0 ∨ false 
c  in DIMACS:
-22004 -22005 -22006  0

c i = 5
c  -2+1 --> -1
c    ( b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧  p_1015) -> ( b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧  b^{203, 6}_0)
c  in CNF:
c    -b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨  b^{203, 6}_2
c    -b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_1
c    -b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨  b^{203, 6}_0
c  in DIMACS:
-22007 -22008  22009 -1015  22010 0
-22007 -22008  22009 -1015 -22011 0
-22007 -22008  22009 -1015  22012 0

c  -1+1 --> 0
c    ( b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0 ∧  p_1015) -> (-b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧ -b^{203, 6}_0)
c  in CNF:
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_2
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_1
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_0
c  in DIMACS:
-22007  22008 -22009 -1015 -22010 0
-22007  22008 -22009 -1015 -22011 0
-22007  22008 -22009 -1015 -22012 0

c  0+1 --> 1
c    (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧  p_1015) -> (-b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧  b^{203, 6}_0)
c  in CNF:
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_2
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_1
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨  b^{203, 6}_0
c  in DIMACS:
 22007  22008  22009 -1015 -22010 0
 22007  22008  22009 -1015 -22011 0
 22007  22008  22009 -1015  22012 0

c  1+1 --> 2
c    (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0 ∧  p_1015) -> (-b^{203, 6}_2 ∧  b^{203, 6}_1 ∧ -b^{203, 6}_0)
c  in CNF:
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_2
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨  b^{203, 6}_1
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ -p_1015 ∨ -b^{203, 6}_0
c  in DIMACS:
 22007  22008 -22009 -1015 -22010 0
 22007  22008 -22009 -1015  22011 0
 22007  22008 -22009 -1015 -22012 0

c  2+1 --> break 
c    (-b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧  p_1015) -> break
c  in CNF:
c     b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ -p_1015 ∨ break
c  in DIMACS:
 22007 -22008  22009 -1015 1162 0


c  2-1 --> 1
c    (-b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧ -p_1015) -> (-b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧  b^{203, 6}_0)
c  in CNF:
c     b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_2
c     b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_1
c     b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨  b^{203, 6}_0
c  in DIMACS:
 22007 -22008  22009  1015 -22010 0
 22007 -22008  22009  1015 -22011 0
 22007 -22008  22009  1015  22012 0

c  1-1 --> 0
c    (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0 ∧ -p_1015) -> (-b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧ -b^{203, 6}_0)
c  in CNF:
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_2
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_1
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_0
c  in DIMACS:
 22007  22008 -22009  1015 -22010 0
 22007  22008 -22009  1015 -22011 0
 22007  22008 -22009  1015 -22012 0

c  0-1 --> -1
c    (-b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧ -p_1015) -> ( b^{203, 6}_2 ∧ -b^{203, 6}_1 ∧  b^{203, 6}_0)
c  in CNF:
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨  b^{203, 6}_2
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_1
c     b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨  b^{203, 6}_0
c  in DIMACS:
 22007  22008  22009  1015  22010 0
 22007  22008  22009  1015 -22011 0
 22007  22008  22009  1015  22012 0

c  -1-1 --> -2
c    ( b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧  b^{203, 5}_0 ∧ -p_1015) -> ( b^{203, 6}_2 ∧  b^{203, 6}_1 ∧ -b^{203, 6}_0)
c  in CNF:
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨  b^{203, 6}_2
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨  b^{203, 6}_1
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨  p_1015 ∨ -b^{203, 6}_0
c  in DIMACS:
-22007  22008 -22009  1015  22010 0
-22007  22008 -22009  1015  22011 0
-22007  22008 -22009  1015 -22012 0

c  -2-1 --> break 
c    ( b^{203, 5}_2 ∧  b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧ -p_1015) -> break
c  in CNF:
c    -b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨  b^{203, 5}_0 ∨  p_1015 ∨ break
c  in DIMACS:
-22007 -22008  22009  1015 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{203, 5}_2 ∧ -b^{203, 5}_1 ∧ -b^{203, 5}_0 ∧ true) 
c  in CNF:
c    -b^{203, 5}_2 ∨  b^{203, 5}_1 ∨  b^{203, 5}_0 ∨ false 
c  in DIMACS:
-22007  22008  22009  0

c  3 does not represent an automaton state.
c    -(-b^{203, 5}_2 ∧  b^{203, 5}_1 ∧  b^{203, 5}_0 ∧ true) 
c  in CNF:
c     b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ false 
c  in DIMACS:
 22007 -22008 -22009  0
c  -3 does not represent an automaton state.
c    -( b^{203, 5}_2 ∧  b^{203, 5}_1 ∧  b^{203, 5}_0 ∧ true) 
c  in CNF:
c    -b^{203, 5}_2 ∨ -b^{203, 5}_1 ∨ -b^{203, 5}_0 ∨ false 
c  in DIMACS:
-22007 -22008 -22009  0

c INIT for k = 204
c    -b^{204, 1}_2
c    -b^{204, 1}_1
c    -b^{204, 1}_0
c  in DIMACS:
-22013 0
-22014 0
-22015 0

c Transitions for k = 204
c i = 1
c  -2+1 --> -1
c    ( b^{204, 1}_2 ∧  b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧  p_204) -> ( b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0)
c  in CNF:
c    -b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨  b^{204, 2}_2
c    -b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_1
c    -b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨  b^{204, 2}_0
c  in DIMACS:
-22013 -22014  22015 -204  22016 0
-22013 -22014  22015 -204 -22017 0
-22013 -22014  22015 -204  22018 0

c  -1+1 --> 0
c    ( b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧  b^{204, 1}_0 ∧  p_204) -> (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧ -b^{204, 2}_0)
c  in CNF:
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_2
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_1
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_0
c  in DIMACS:
-22013  22014 -22015 -204 -22016 0
-22013  22014 -22015 -204 -22017 0
-22013  22014 -22015 -204 -22018 0

c  0+1 --> 1
c    (-b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧  p_204) -> (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0)
c  in CNF:
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_2
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_1
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨  b^{204, 2}_0
c  in DIMACS:
 22013  22014  22015 -204 -22016 0
 22013  22014  22015 -204 -22017 0
 22013  22014  22015 -204  22018 0

c  1+1 --> 2
c    (-b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧  b^{204, 1}_0 ∧  p_204) -> (-b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0)
c  in CNF:
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_2
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨  b^{204, 2}_1
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ -p_204 ∨ -b^{204, 2}_0
c  in DIMACS:
 22013  22014 -22015 -204 -22016 0
 22013  22014 -22015 -204  22017 0
 22013  22014 -22015 -204 -22018 0

c  2+1 --> break 
c    (-b^{204, 1}_2 ∧  b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧  p_204) -> break
c  in CNF:
c     b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ -p_204 ∨ break
c  in DIMACS:
 22013 -22014  22015 -204 1162 0


c  2-1 --> 1
c    (-b^{204, 1}_2 ∧  b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧ -p_204) -> (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0)
c  in CNF:
c     b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_2
c     b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_1
c     b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨  b^{204, 2}_0
c  in DIMACS:
 22013 -22014  22015  204 -22016 0
 22013 -22014  22015  204 -22017 0
 22013 -22014  22015  204  22018 0

c  1-1 --> 0
c    (-b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧  b^{204, 1}_0 ∧ -p_204) -> (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧ -b^{204, 2}_0)
c  in CNF:
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_2
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_1
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_0
c  in DIMACS:
 22013  22014 -22015  204 -22016 0
 22013  22014 -22015  204 -22017 0
 22013  22014 -22015  204 -22018 0

c  0-1 --> -1
c    (-b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧ -p_204) -> ( b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0)
c  in CNF:
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨  b^{204, 2}_2
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_1
c     b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨  b^{204, 2}_0
c  in DIMACS:
 22013  22014  22015  204  22016 0
 22013  22014  22015  204 -22017 0
 22013  22014  22015  204  22018 0

c  -1-1 --> -2
c    ( b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧  b^{204, 1}_0 ∧ -p_204) -> ( b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0)
c  in CNF:
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨  b^{204, 2}_2
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨  b^{204, 2}_1
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨  p_204 ∨ -b^{204, 2}_0
c  in DIMACS:
-22013  22014 -22015  204  22016 0
-22013  22014 -22015  204  22017 0
-22013  22014 -22015  204 -22018 0

c  -2-1 --> break 
c    ( b^{204, 1}_2 ∧  b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧ -p_204) -> break
c  in CNF:
c    -b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨  b^{204, 1}_0 ∨  p_204 ∨ break
c  in DIMACS:
-22013 -22014  22015  204 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{204, 1}_2 ∧ -b^{204, 1}_1 ∧ -b^{204, 1}_0 ∧ true) 
c  in CNF:
c    -b^{204, 1}_2 ∨  b^{204, 1}_1 ∨  b^{204, 1}_0 ∨ false 
c  in DIMACS:
-22013  22014  22015  0

c  3 does not represent an automaton state.
c    -(-b^{204, 1}_2 ∧  b^{204, 1}_1 ∧  b^{204, 1}_0 ∧ true) 
c  in CNF:
c     b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ false 
c  in DIMACS:
 22013 -22014 -22015  0
c  -3 does not represent an automaton state.
c    -( b^{204, 1}_2 ∧  b^{204, 1}_1 ∧  b^{204, 1}_0 ∧ true) 
c  in CNF:
c    -b^{204, 1}_2 ∨ -b^{204, 1}_1 ∨ -b^{204, 1}_0 ∨ false 
c  in DIMACS:
-22013 -22014 -22015  0

c i = 2
c  -2+1 --> -1
c    ( b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧  p_408) -> ( b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0)
c  in CNF:
c    -b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨  b^{204, 3}_2
c    -b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_1
c    -b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨  b^{204, 3}_0
c  in DIMACS:
-22016 -22017  22018 -408  22019 0
-22016 -22017  22018 -408 -22020 0
-22016 -22017  22018 -408  22021 0

c  -1+1 --> 0
c    ( b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0 ∧  p_408) -> (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧ -b^{204, 3}_0)
c  in CNF:
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_2
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_1
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_0
c  in DIMACS:
-22016  22017 -22018 -408 -22019 0
-22016  22017 -22018 -408 -22020 0
-22016  22017 -22018 -408 -22021 0

c  0+1 --> 1
c    (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧  p_408) -> (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0)
c  in CNF:
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_2
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_1
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨  b^{204, 3}_0
c  in DIMACS:
 22016  22017  22018 -408 -22019 0
 22016  22017  22018 -408 -22020 0
 22016  22017  22018 -408  22021 0

c  1+1 --> 2
c    (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0 ∧  p_408) -> (-b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0)
c  in CNF:
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_2
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨  b^{204, 3}_1
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ -p_408 ∨ -b^{204, 3}_0
c  in DIMACS:
 22016  22017 -22018 -408 -22019 0
 22016  22017 -22018 -408  22020 0
 22016  22017 -22018 -408 -22021 0

c  2+1 --> break 
c    (-b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧  p_408) -> break
c  in CNF:
c     b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ -p_408 ∨ break
c  in DIMACS:
 22016 -22017  22018 -408 1162 0


c  2-1 --> 1
c    (-b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧ -p_408) -> (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0)
c  in CNF:
c     b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_2
c     b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_1
c     b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨  b^{204, 3}_0
c  in DIMACS:
 22016 -22017  22018  408 -22019 0
 22016 -22017  22018  408 -22020 0
 22016 -22017  22018  408  22021 0

c  1-1 --> 0
c    (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0 ∧ -p_408) -> (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧ -b^{204, 3}_0)
c  in CNF:
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_2
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_1
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_0
c  in DIMACS:
 22016  22017 -22018  408 -22019 0
 22016  22017 -22018  408 -22020 0
 22016  22017 -22018  408 -22021 0

c  0-1 --> -1
c    (-b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧ -p_408) -> ( b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0)
c  in CNF:
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨  b^{204, 3}_2
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_1
c     b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨  b^{204, 3}_0
c  in DIMACS:
 22016  22017  22018  408  22019 0
 22016  22017  22018  408 -22020 0
 22016  22017  22018  408  22021 0

c  -1-1 --> -2
c    ( b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧  b^{204, 2}_0 ∧ -p_408) -> ( b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0)
c  in CNF:
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨  b^{204, 3}_2
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨  b^{204, 3}_1
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨  p_408 ∨ -b^{204, 3}_0
c  in DIMACS:
-22016  22017 -22018  408  22019 0
-22016  22017 -22018  408  22020 0
-22016  22017 -22018  408 -22021 0

c  -2-1 --> break 
c    ( b^{204, 2}_2 ∧  b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧ -p_408) -> break
c  in CNF:
c    -b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨  b^{204, 2}_0 ∨  p_408 ∨ break
c  in DIMACS:
-22016 -22017  22018  408 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{204, 2}_2 ∧ -b^{204, 2}_1 ∧ -b^{204, 2}_0 ∧ true) 
c  in CNF:
c    -b^{204, 2}_2 ∨  b^{204, 2}_1 ∨  b^{204, 2}_0 ∨ false 
c  in DIMACS:
-22016  22017  22018  0

c  3 does not represent an automaton state.
c    -(-b^{204, 2}_2 ∧  b^{204, 2}_1 ∧  b^{204, 2}_0 ∧ true) 
c  in CNF:
c     b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ false 
c  in DIMACS:
 22016 -22017 -22018  0
c  -3 does not represent an automaton state.
c    -( b^{204, 2}_2 ∧  b^{204, 2}_1 ∧  b^{204, 2}_0 ∧ true) 
c  in CNF:
c    -b^{204, 2}_2 ∨ -b^{204, 2}_1 ∨ -b^{204, 2}_0 ∨ false 
c  in DIMACS:
-22016 -22017 -22018  0

c i = 3
c  -2+1 --> -1
c    ( b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧  p_612) -> ( b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0)
c  in CNF:
c    -b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨  b^{204, 4}_2
c    -b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_1
c    -b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨  b^{204, 4}_0
c  in DIMACS:
-22019 -22020  22021 -612  22022 0
-22019 -22020  22021 -612 -22023 0
-22019 -22020  22021 -612  22024 0

c  -1+1 --> 0
c    ( b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0 ∧  p_612) -> (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧ -b^{204, 4}_0)
c  in CNF:
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_2
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_1
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_0
c  in DIMACS:
-22019  22020 -22021 -612 -22022 0
-22019  22020 -22021 -612 -22023 0
-22019  22020 -22021 -612 -22024 0

c  0+1 --> 1
c    (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧  p_612) -> (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0)
c  in CNF:
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_2
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_1
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨  b^{204, 4}_0
c  in DIMACS:
 22019  22020  22021 -612 -22022 0
 22019  22020  22021 -612 -22023 0
 22019  22020  22021 -612  22024 0

c  1+1 --> 2
c    (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0 ∧  p_612) -> (-b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0)
c  in CNF:
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_2
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨  b^{204, 4}_1
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ -p_612 ∨ -b^{204, 4}_0
c  in DIMACS:
 22019  22020 -22021 -612 -22022 0
 22019  22020 -22021 -612  22023 0
 22019  22020 -22021 -612 -22024 0

c  2+1 --> break 
c    (-b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧  p_612) -> break
c  in CNF:
c     b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 22019 -22020  22021 -612 1162 0


c  2-1 --> 1
c    (-b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧ -p_612) -> (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0)
c  in CNF:
c     b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_2
c     b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_1
c     b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨  b^{204, 4}_0
c  in DIMACS:
 22019 -22020  22021  612 -22022 0
 22019 -22020  22021  612 -22023 0
 22019 -22020  22021  612  22024 0

c  1-1 --> 0
c    (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0 ∧ -p_612) -> (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧ -b^{204, 4}_0)
c  in CNF:
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_2
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_1
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_0
c  in DIMACS:
 22019  22020 -22021  612 -22022 0
 22019  22020 -22021  612 -22023 0
 22019  22020 -22021  612 -22024 0

c  0-1 --> -1
c    (-b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧ -p_612) -> ( b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0)
c  in CNF:
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨  b^{204, 4}_2
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_1
c     b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨  b^{204, 4}_0
c  in DIMACS:
 22019  22020  22021  612  22022 0
 22019  22020  22021  612 -22023 0
 22019  22020  22021  612  22024 0

c  -1-1 --> -2
c    ( b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧  b^{204, 3}_0 ∧ -p_612) -> ( b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0)
c  in CNF:
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨  b^{204, 4}_2
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨  b^{204, 4}_1
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨  p_612 ∨ -b^{204, 4}_0
c  in DIMACS:
-22019  22020 -22021  612  22022 0
-22019  22020 -22021  612  22023 0
-22019  22020 -22021  612 -22024 0

c  -2-1 --> break 
c    ( b^{204, 3}_2 ∧  b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨  b^{204, 3}_0 ∨  p_612 ∨ break
c  in DIMACS:
-22019 -22020  22021  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{204, 3}_2 ∧ -b^{204, 3}_1 ∧ -b^{204, 3}_0 ∧ true) 
c  in CNF:
c    -b^{204, 3}_2 ∨  b^{204, 3}_1 ∨  b^{204, 3}_0 ∨ false 
c  in DIMACS:
-22019  22020  22021  0

c  3 does not represent an automaton state.
c    -(-b^{204, 3}_2 ∧  b^{204, 3}_1 ∧  b^{204, 3}_0 ∧ true) 
c  in CNF:
c     b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ false 
c  in DIMACS:
 22019 -22020 -22021  0
c  -3 does not represent an automaton state.
c    -( b^{204, 3}_2 ∧  b^{204, 3}_1 ∧  b^{204, 3}_0 ∧ true) 
c  in CNF:
c    -b^{204, 3}_2 ∨ -b^{204, 3}_1 ∨ -b^{204, 3}_0 ∨ false 
c  in DIMACS:
-22019 -22020 -22021  0

c i = 4
c  -2+1 --> -1
c    ( b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧  p_816) -> ( b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0)
c  in CNF:
c    -b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨  b^{204, 5}_2
c    -b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_1
c    -b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨  b^{204, 5}_0
c  in DIMACS:
-22022 -22023  22024 -816  22025 0
-22022 -22023  22024 -816 -22026 0
-22022 -22023  22024 -816  22027 0

c  -1+1 --> 0
c    ( b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0 ∧  p_816) -> (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧ -b^{204, 5}_0)
c  in CNF:
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_2
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_1
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_0
c  in DIMACS:
-22022  22023 -22024 -816 -22025 0
-22022  22023 -22024 -816 -22026 0
-22022  22023 -22024 -816 -22027 0

c  0+1 --> 1
c    (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧  p_816) -> (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0)
c  in CNF:
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_2
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_1
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨  b^{204, 5}_0
c  in DIMACS:
 22022  22023  22024 -816 -22025 0
 22022  22023  22024 -816 -22026 0
 22022  22023  22024 -816  22027 0

c  1+1 --> 2
c    (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0 ∧  p_816) -> (-b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0)
c  in CNF:
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_2
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨  b^{204, 5}_1
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ -p_816 ∨ -b^{204, 5}_0
c  in DIMACS:
 22022  22023 -22024 -816 -22025 0
 22022  22023 -22024 -816  22026 0
 22022  22023 -22024 -816 -22027 0

c  2+1 --> break 
c    (-b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧  p_816) -> break
c  in CNF:
c     b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 22022 -22023  22024 -816 1162 0


c  2-1 --> 1
c    (-b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧ -p_816) -> (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0)
c  in CNF:
c     b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_2
c     b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_1
c     b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨  b^{204, 5}_0
c  in DIMACS:
 22022 -22023  22024  816 -22025 0
 22022 -22023  22024  816 -22026 0
 22022 -22023  22024  816  22027 0

c  1-1 --> 0
c    (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0 ∧ -p_816) -> (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧ -b^{204, 5}_0)
c  in CNF:
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_2
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_1
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_0
c  in DIMACS:
 22022  22023 -22024  816 -22025 0
 22022  22023 -22024  816 -22026 0
 22022  22023 -22024  816 -22027 0

c  0-1 --> -1
c    (-b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧ -p_816) -> ( b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0)
c  in CNF:
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨  b^{204, 5}_2
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_1
c     b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨  b^{204, 5}_0
c  in DIMACS:
 22022  22023  22024  816  22025 0
 22022  22023  22024  816 -22026 0
 22022  22023  22024  816  22027 0

c  -1-1 --> -2
c    ( b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧  b^{204, 4}_0 ∧ -p_816) -> ( b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0)
c  in CNF:
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨  b^{204, 5}_2
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨  b^{204, 5}_1
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨  p_816 ∨ -b^{204, 5}_0
c  in DIMACS:
-22022  22023 -22024  816  22025 0
-22022  22023 -22024  816  22026 0
-22022  22023 -22024  816 -22027 0

c  -2-1 --> break 
c    ( b^{204, 4}_2 ∧  b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨  b^{204, 4}_0 ∨  p_816 ∨ break
c  in DIMACS:
-22022 -22023  22024  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{204, 4}_2 ∧ -b^{204, 4}_1 ∧ -b^{204, 4}_0 ∧ true) 
c  in CNF:
c    -b^{204, 4}_2 ∨  b^{204, 4}_1 ∨  b^{204, 4}_0 ∨ false 
c  in DIMACS:
-22022  22023  22024  0

c  3 does not represent an automaton state.
c    -(-b^{204, 4}_2 ∧  b^{204, 4}_1 ∧  b^{204, 4}_0 ∧ true) 
c  in CNF:
c     b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ false 
c  in DIMACS:
 22022 -22023 -22024  0
c  -3 does not represent an automaton state.
c    -( b^{204, 4}_2 ∧  b^{204, 4}_1 ∧  b^{204, 4}_0 ∧ true) 
c  in CNF:
c    -b^{204, 4}_2 ∨ -b^{204, 4}_1 ∨ -b^{204, 4}_0 ∨ false 
c  in DIMACS:
-22022 -22023 -22024  0

c i = 5
c  -2+1 --> -1
c    ( b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧  p_1020) -> ( b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧  b^{204, 6}_0)
c  in CNF:
c    -b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨  b^{204, 6}_2
c    -b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_1
c    -b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨  b^{204, 6}_0
c  in DIMACS:
-22025 -22026  22027 -1020  22028 0
-22025 -22026  22027 -1020 -22029 0
-22025 -22026  22027 -1020  22030 0

c  -1+1 --> 0
c    ( b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0 ∧  p_1020) -> (-b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧ -b^{204, 6}_0)
c  in CNF:
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_2
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_1
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_0
c  in DIMACS:
-22025  22026 -22027 -1020 -22028 0
-22025  22026 -22027 -1020 -22029 0
-22025  22026 -22027 -1020 -22030 0

c  0+1 --> 1
c    (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧  p_1020) -> (-b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧  b^{204, 6}_0)
c  in CNF:
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_2
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_1
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨  b^{204, 6}_0
c  in DIMACS:
 22025  22026  22027 -1020 -22028 0
 22025  22026  22027 -1020 -22029 0
 22025  22026  22027 -1020  22030 0

c  1+1 --> 2
c    (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0 ∧  p_1020) -> (-b^{204, 6}_2 ∧  b^{204, 6}_1 ∧ -b^{204, 6}_0)
c  in CNF:
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_2
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨  b^{204, 6}_1
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ -p_1020 ∨ -b^{204, 6}_0
c  in DIMACS:
 22025  22026 -22027 -1020 -22028 0
 22025  22026 -22027 -1020  22029 0
 22025  22026 -22027 -1020 -22030 0

c  2+1 --> break 
c    (-b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 22025 -22026  22027 -1020 1162 0


c  2-1 --> 1
c    (-b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧ -p_1020) -> (-b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧  b^{204, 6}_0)
c  in CNF:
c     b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_2
c     b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_1
c     b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨  b^{204, 6}_0
c  in DIMACS:
 22025 -22026  22027  1020 -22028 0
 22025 -22026  22027  1020 -22029 0
 22025 -22026  22027  1020  22030 0

c  1-1 --> 0
c    (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0 ∧ -p_1020) -> (-b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧ -b^{204, 6}_0)
c  in CNF:
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_2
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_1
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_0
c  in DIMACS:
 22025  22026 -22027  1020 -22028 0
 22025  22026 -22027  1020 -22029 0
 22025  22026 -22027  1020 -22030 0

c  0-1 --> -1
c    (-b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧ -p_1020) -> ( b^{204, 6}_2 ∧ -b^{204, 6}_1 ∧  b^{204, 6}_0)
c  in CNF:
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨  b^{204, 6}_2
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_1
c     b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨  b^{204, 6}_0
c  in DIMACS:
 22025  22026  22027  1020  22028 0
 22025  22026  22027  1020 -22029 0
 22025  22026  22027  1020  22030 0

c  -1-1 --> -2
c    ( b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧  b^{204, 5}_0 ∧ -p_1020) -> ( b^{204, 6}_2 ∧  b^{204, 6}_1 ∧ -b^{204, 6}_0)
c  in CNF:
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨  b^{204, 6}_2
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨  b^{204, 6}_1
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨  p_1020 ∨ -b^{204, 6}_0
c  in DIMACS:
-22025  22026 -22027  1020  22028 0
-22025  22026 -22027  1020  22029 0
-22025  22026 -22027  1020 -22030 0

c  -2-1 --> break 
c    ( b^{204, 5}_2 ∧  b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨  b^{204, 5}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-22025 -22026  22027  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{204, 5}_2 ∧ -b^{204, 5}_1 ∧ -b^{204, 5}_0 ∧ true) 
c  in CNF:
c    -b^{204, 5}_2 ∨  b^{204, 5}_1 ∨  b^{204, 5}_0 ∨ false 
c  in DIMACS:
-22025  22026  22027  0

c  3 does not represent an automaton state.
c    -(-b^{204, 5}_2 ∧  b^{204, 5}_1 ∧  b^{204, 5}_0 ∧ true) 
c  in CNF:
c     b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ false 
c  in DIMACS:
 22025 -22026 -22027  0
c  -3 does not represent an automaton state.
c    -( b^{204, 5}_2 ∧  b^{204, 5}_1 ∧  b^{204, 5}_0 ∧ true) 
c  in CNF:
c    -b^{204, 5}_2 ∨ -b^{204, 5}_1 ∨ -b^{204, 5}_0 ∨ false 
c  in DIMACS:
-22025 -22026 -22027  0

c INIT for k = 205
c    -b^{205, 1}_2
c    -b^{205, 1}_1
c    -b^{205, 1}_0
c  in DIMACS:
-22031 0
-22032 0
-22033 0

c Transitions for k = 205
c i = 1
c  -2+1 --> -1
c    ( b^{205, 1}_2 ∧  b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧  p_205) -> ( b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0)
c  in CNF:
c    -b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨  b^{205, 2}_2
c    -b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_1
c    -b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨  b^{205, 2}_0
c  in DIMACS:
-22031 -22032  22033 -205  22034 0
-22031 -22032  22033 -205 -22035 0
-22031 -22032  22033 -205  22036 0

c  -1+1 --> 0
c    ( b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧  b^{205, 1}_0 ∧  p_205) -> (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧ -b^{205, 2}_0)
c  in CNF:
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_2
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_1
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_0
c  in DIMACS:
-22031  22032 -22033 -205 -22034 0
-22031  22032 -22033 -205 -22035 0
-22031  22032 -22033 -205 -22036 0

c  0+1 --> 1
c    (-b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧  p_205) -> (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0)
c  in CNF:
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_2
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_1
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨  b^{205, 2}_0
c  in DIMACS:
 22031  22032  22033 -205 -22034 0
 22031  22032  22033 -205 -22035 0
 22031  22032  22033 -205  22036 0

c  1+1 --> 2
c    (-b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧  b^{205, 1}_0 ∧  p_205) -> (-b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0)
c  in CNF:
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_2
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨  b^{205, 2}_1
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ -p_205 ∨ -b^{205, 2}_0
c  in DIMACS:
 22031  22032 -22033 -205 -22034 0
 22031  22032 -22033 -205  22035 0
 22031  22032 -22033 -205 -22036 0

c  2+1 --> break 
c    (-b^{205, 1}_2 ∧  b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧  p_205) -> break
c  in CNF:
c     b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ -p_205 ∨ break
c  in DIMACS:
 22031 -22032  22033 -205 1162 0


c  2-1 --> 1
c    (-b^{205, 1}_2 ∧  b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧ -p_205) -> (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0)
c  in CNF:
c     b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_2
c     b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_1
c     b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨  b^{205, 2}_0
c  in DIMACS:
 22031 -22032  22033  205 -22034 0
 22031 -22032  22033  205 -22035 0
 22031 -22032  22033  205  22036 0

c  1-1 --> 0
c    (-b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧  b^{205, 1}_0 ∧ -p_205) -> (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧ -b^{205, 2}_0)
c  in CNF:
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_2
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_1
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_0
c  in DIMACS:
 22031  22032 -22033  205 -22034 0
 22031  22032 -22033  205 -22035 0
 22031  22032 -22033  205 -22036 0

c  0-1 --> -1
c    (-b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧ -p_205) -> ( b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0)
c  in CNF:
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨  b^{205, 2}_2
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_1
c     b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨  b^{205, 2}_0
c  in DIMACS:
 22031  22032  22033  205  22034 0
 22031  22032  22033  205 -22035 0
 22031  22032  22033  205  22036 0

c  -1-1 --> -2
c    ( b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧  b^{205, 1}_0 ∧ -p_205) -> ( b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0)
c  in CNF:
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨  b^{205, 2}_2
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨  b^{205, 2}_1
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨  p_205 ∨ -b^{205, 2}_0
c  in DIMACS:
-22031  22032 -22033  205  22034 0
-22031  22032 -22033  205  22035 0
-22031  22032 -22033  205 -22036 0

c  -2-1 --> break 
c    ( b^{205, 1}_2 ∧  b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧ -p_205) -> break
c  in CNF:
c    -b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨  b^{205, 1}_0 ∨  p_205 ∨ break
c  in DIMACS:
-22031 -22032  22033  205 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{205, 1}_2 ∧ -b^{205, 1}_1 ∧ -b^{205, 1}_0 ∧ true) 
c  in CNF:
c    -b^{205, 1}_2 ∨  b^{205, 1}_1 ∨  b^{205, 1}_0 ∨ false 
c  in DIMACS:
-22031  22032  22033  0

c  3 does not represent an automaton state.
c    -(-b^{205, 1}_2 ∧  b^{205, 1}_1 ∧  b^{205, 1}_0 ∧ true) 
c  in CNF:
c     b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ false 
c  in DIMACS:
 22031 -22032 -22033  0
c  -3 does not represent an automaton state.
c    -( b^{205, 1}_2 ∧  b^{205, 1}_1 ∧  b^{205, 1}_0 ∧ true) 
c  in CNF:
c    -b^{205, 1}_2 ∨ -b^{205, 1}_1 ∨ -b^{205, 1}_0 ∨ false 
c  in DIMACS:
-22031 -22032 -22033  0

c i = 2
c  -2+1 --> -1
c    ( b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧  p_410) -> ( b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0)
c  in CNF:
c    -b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨  b^{205, 3}_2
c    -b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_1
c    -b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨  b^{205, 3}_0
c  in DIMACS:
-22034 -22035  22036 -410  22037 0
-22034 -22035  22036 -410 -22038 0
-22034 -22035  22036 -410  22039 0

c  -1+1 --> 0
c    ( b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0 ∧  p_410) -> (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧ -b^{205, 3}_0)
c  in CNF:
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_2
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_1
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_0
c  in DIMACS:
-22034  22035 -22036 -410 -22037 0
-22034  22035 -22036 -410 -22038 0
-22034  22035 -22036 -410 -22039 0

c  0+1 --> 1
c    (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧  p_410) -> (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0)
c  in CNF:
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_2
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_1
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨  b^{205, 3}_0
c  in DIMACS:
 22034  22035  22036 -410 -22037 0
 22034  22035  22036 -410 -22038 0
 22034  22035  22036 -410  22039 0

c  1+1 --> 2
c    (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0 ∧  p_410) -> (-b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0)
c  in CNF:
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_2
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨  b^{205, 3}_1
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ -p_410 ∨ -b^{205, 3}_0
c  in DIMACS:
 22034  22035 -22036 -410 -22037 0
 22034  22035 -22036 -410  22038 0
 22034  22035 -22036 -410 -22039 0

c  2+1 --> break 
c    (-b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧  p_410) -> break
c  in CNF:
c     b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ -p_410 ∨ break
c  in DIMACS:
 22034 -22035  22036 -410 1162 0


c  2-1 --> 1
c    (-b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧ -p_410) -> (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0)
c  in CNF:
c     b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_2
c     b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_1
c     b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨  b^{205, 3}_0
c  in DIMACS:
 22034 -22035  22036  410 -22037 0
 22034 -22035  22036  410 -22038 0
 22034 -22035  22036  410  22039 0

c  1-1 --> 0
c    (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0 ∧ -p_410) -> (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧ -b^{205, 3}_0)
c  in CNF:
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_2
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_1
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_0
c  in DIMACS:
 22034  22035 -22036  410 -22037 0
 22034  22035 -22036  410 -22038 0
 22034  22035 -22036  410 -22039 0

c  0-1 --> -1
c    (-b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧ -p_410) -> ( b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0)
c  in CNF:
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨  b^{205, 3}_2
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_1
c     b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨  b^{205, 3}_0
c  in DIMACS:
 22034  22035  22036  410  22037 0
 22034  22035  22036  410 -22038 0
 22034  22035  22036  410  22039 0

c  -1-1 --> -2
c    ( b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧  b^{205, 2}_0 ∧ -p_410) -> ( b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0)
c  in CNF:
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨  b^{205, 3}_2
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨  b^{205, 3}_1
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨  p_410 ∨ -b^{205, 3}_0
c  in DIMACS:
-22034  22035 -22036  410  22037 0
-22034  22035 -22036  410  22038 0
-22034  22035 -22036  410 -22039 0

c  -2-1 --> break 
c    ( b^{205, 2}_2 ∧  b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧ -p_410) -> break
c  in CNF:
c    -b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨  b^{205, 2}_0 ∨  p_410 ∨ break
c  in DIMACS:
-22034 -22035  22036  410 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{205, 2}_2 ∧ -b^{205, 2}_1 ∧ -b^{205, 2}_0 ∧ true) 
c  in CNF:
c    -b^{205, 2}_2 ∨  b^{205, 2}_1 ∨  b^{205, 2}_0 ∨ false 
c  in DIMACS:
-22034  22035  22036  0

c  3 does not represent an automaton state.
c    -(-b^{205, 2}_2 ∧  b^{205, 2}_1 ∧  b^{205, 2}_0 ∧ true) 
c  in CNF:
c     b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ false 
c  in DIMACS:
 22034 -22035 -22036  0
c  -3 does not represent an automaton state.
c    -( b^{205, 2}_2 ∧  b^{205, 2}_1 ∧  b^{205, 2}_0 ∧ true) 
c  in CNF:
c    -b^{205, 2}_2 ∨ -b^{205, 2}_1 ∨ -b^{205, 2}_0 ∨ false 
c  in DIMACS:
-22034 -22035 -22036  0

c i = 3
c  -2+1 --> -1
c    ( b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧  p_615) -> ( b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0)
c  in CNF:
c    -b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨  b^{205, 4}_2
c    -b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_1
c    -b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨  b^{205, 4}_0
c  in DIMACS:
-22037 -22038  22039 -615  22040 0
-22037 -22038  22039 -615 -22041 0
-22037 -22038  22039 -615  22042 0

c  -1+1 --> 0
c    ( b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0 ∧  p_615) -> (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧ -b^{205, 4}_0)
c  in CNF:
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_2
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_1
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_0
c  in DIMACS:
-22037  22038 -22039 -615 -22040 0
-22037  22038 -22039 -615 -22041 0
-22037  22038 -22039 -615 -22042 0

c  0+1 --> 1
c    (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧  p_615) -> (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0)
c  in CNF:
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_2
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_1
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨  b^{205, 4}_0
c  in DIMACS:
 22037  22038  22039 -615 -22040 0
 22037  22038  22039 -615 -22041 0
 22037  22038  22039 -615  22042 0

c  1+1 --> 2
c    (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0 ∧  p_615) -> (-b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0)
c  in CNF:
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_2
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨  b^{205, 4}_1
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ -p_615 ∨ -b^{205, 4}_0
c  in DIMACS:
 22037  22038 -22039 -615 -22040 0
 22037  22038 -22039 -615  22041 0
 22037  22038 -22039 -615 -22042 0

c  2+1 --> break 
c    (-b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧  p_615) -> break
c  in CNF:
c     b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ -p_615 ∨ break
c  in DIMACS:
 22037 -22038  22039 -615 1162 0


c  2-1 --> 1
c    (-b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧ -p_615) -> (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0)
c  in CNF:
c     b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_2
c     b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_1
c     b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨  b^{205, 4}_0
c  in DIMACS:
 22037 -22038  22039  615 -22040 0
 22037 -22038  22039  615 -22041 0
 22037 -22038  22039  615  22042 0

c  1-1 --> 0
c    (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0 ∧ -p_615) -> (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧ -b^{205, 4}_0)
c  in CNF:
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_2
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_1
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_0
c  in DIMACS:
 22037  22038 -22039  615 -22040 0
 22037  22038 -22039  615 -22041 0
 22037  22038 -22039  615 -22042 0

c  0-1 --> -1
c    (-b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧ -p_615) -> ( b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0)
c  in CNF:
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨  b^{205, 4}_2
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_1
c     b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨  b^{205, 4}_0
c  in DIMACS:
 22037  22038  22039  615  22040 0
 22037  22038  22039  615 -22041 0
 22037  22038  22039  615  22042 0

c  -1-1 --> -2
c    ( b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧  b^{205, 3}_0 ∧ -p_615) -> ( b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0)
c  in CNF:
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨  b^{205, 4}_2
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨  b^{205, 4}_1
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨  p_615 ∨ -b^{205, 4}_0
c  in DIMACS:
-22037  22038 -22039  615  22040 0
-22037  22038 -22039  615  22041 0
-22037  22038 -22039  615 -22042 0

c  -2-1 --> break 
c    ( b^{205, 3}_2 ∧  b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧ -p_615) -> break
c  in CNF:
c    -b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨  b^{205, 3}_0 ∨  p_615 ∨ break
c  in DIMACS:
-22037 -22038  22039  615 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{205, 3}_2 ∧ -b^{205, 3}_1 ∧ -b^{205, 3}_0 ∧ true) 
c  in CNF:
c    -b^{205, 3}_2 ∨  b^{205, 3}_1 ∨  b^{205, 3}_0 ∨ false 
c  in DIMACS:
-22037  22038  22039  0

c  3 does not represent an automaton state.
c    -(-b^{205, 3}_2 ∧  b^{205, 3}_1 ∧  b^{205, 3}_0 ∧ true) 
c  in CNF:
c     b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ false 
c  in DIMACS:
 22037 -22038 -22039  0
c  -3 does not represent an automaton state.
c    -( b^{205, 3}_2 ∧  b^{205, 3}_1 ∧  b^{205, 3}_0 ∧ true) 
c  in CNF:
c    -b^{205, 3}_2 ∨ -b^{205, 3}_1 ∨ -b^{205, 3}_0 ∨ false 
c  in DIMACS:
-22037 -22038 -22039  0

c i = 4
c  -2+1 --> -1
c    ( b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧  p_820) -> ( b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0)
c  in CNF:
c    -b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨  b^{205, 5}_2
c    -b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_1
c    -b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨  b^{205, 5}_0
c  in DIMACS:
-22040 -22041  22042 -820  22043 0
-22040 -22041  22042 -820 -22044 0
-22040 -22041  22042 -820  22045 0

c  -1+1 --> 0
c    ( b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0 ∧  p_820) -> (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧ -b^{205, 5}_0)
c  in CNF:
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_2
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_1
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_0
c  in DIMACS:
-22040  22041 -22042 -820 -22043 0
-22040  22041 -22042 -820 -22044 0
-22040  22041 -22042 -820 -22045 0

c  0+1 --> 1
c    (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧  p_820) -> (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0)
c  in CNF:
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_2
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_1
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨  b^{205, 5}_0
c  in DIMACS:
 22040  22041  22042 -820 -22043 0
 22040  22041  22042 -820 -22044 0
 22040  22041  22042 -820  22045 0

c  1+1 --> 2
c    (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0 ∧  p_820) -> (-b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0)
c  in CNF:
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_2
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨  b^{205, 5}_1
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ -p_820 ∨ -b^{205, 5}_0
c  in DIMACS:
 22040  22041 -22042 -820 -22043 0
 22040  22041 -22042 -820  22044 0
 22040  22041 -22042 -820 -22045 0

c  2+1 --> break 
c    (-b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧  p_820) -> break
c  in CNF:
c     b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ -p_820 ∨ break
c  in DIMACS:
 22040 -22041  22042 -820 1162 0


c  2-1 --> 1
c    (-b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧ -p_820) -> (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0)
c  in CNF:
c     b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_2
c     b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_1
c     b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨  b^{205, 5}_0
c  in DIMACS:
 22040 -22041  22042  820 -22043 0
 22040 -22041  22042  820 -22044 0
 22040 -22041  22042  820  22045 0

c  1-1 --> 0
c    (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0 ∧ -p_820) -> (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧ -b^{205, 5}_0)
c  in CNF:
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_2
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_1
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_0
c  in DIMACS:
 22040  22041 -22042  820 -22043 0
 22040  22041 -22042  820 -22044 0
 22040  22041 -22042  820 -22045 0

c  0-1 --> -1
c    (-b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧ -p_820) -> ( b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0)
c  in CNF:
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨  b^{205, 5}_2
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_1
c     b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨  b^{205, 5}_0
c  in DIMACS:
 22040  22041  22042  820  22043 0
 22040  22041  22042  820 -22044 0
 22040  22041  22042  820  22045 0

c  -1-1 --> -2
c    ( b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧  b^{205, 4}_0 ∧ -p_820) -> ( b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0)
c  in CNF:
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨  b^{205, 5}_2
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨  b^{205, 5}_1
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨  p_820 ∨ -b^{205, 5}_0
c  in DIMACS:
-22040  22041 -22042  820  22043 0
-22040  22041 -22042  820  22044 0
-22040  22041 -22042  820 -22045 0

c  -2-1 --> break 
c    ( b^{205, 4}_2 ∧  b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧ -p_820) -> break
c  in CNF:
c    -b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨  b^{205, 4}_0 ∨  p_820 ∨ break
c  in DIMACS:
-22040 -22041  22042  820 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{205, 4}_2 ∧ -b^{205, 4}_1 ∧ -b^{205, 4}_0 ∧ true) 
c  in CNF:
c    -b^{205, 4}_2 ∨  b^{205, 4}_1 ∨  b^{205, 4}_0 ∨ false 
c  in DIMACS:
-22040  22041  22042  0

c  3 does not represent an automaton state.
c    -(-b^{205, 4}_2 ∧  b^{205, 4}_1 ∧  b^{205, 4}_0 ∧ true) 
c  in CNF:
c     b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ false 
c  in DIMACS:
 22040 -22041 -22042  0
c  -3 does not represent an automaton state.
c    -( b^{205, 4}_2 ∧  b^{205, 4}_1 ∧  b^{205, 4}_0 ∧ true) 
c  in CNF:
c    -b^{205, 4}_2 ∨ -b^{205, 4}_1 ∨ -b^{205, 4}_0 ∨ false 
c  in DIMACS:
-22040 -22041 -22042  0

c i = 5
c  -2+1 --> -1
c    ( b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧  p_1025) -> ( b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧  b^{205, 6}_0)
c  in CNF:
c    -b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨  b^{205, 6}_2
c    -b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_1
c    -b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨  b^{205, 6}_0
c  in DIMACS:
-22043 -22044  22045 -1025  22046 0
-22043 -22044  22045 -1025 -22047 0
-22043 -22044  22045 -1025  22048 0

c  -1+1 --> 0
c    ( b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0 ∧  p_1025) -> (-b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧ -b^{205, 6}_0)
c  in CNF:
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_2
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_1
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_0
c  in DIMACS:
-22043  22044 -22045 -1025 -22046 0
-22043  22044 -22045 -1025 -22047 0
-22043  22044 -22045 -1025 -22048 0

c  0+1 --> 1
c    (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧  p_1025) -> (-b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧  b^{205, 6}_0)
c  in CNF:
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_2
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_1
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨  b^{205, 6}_0
c  in DIMACS:
 22043  22044  22045 -1025 -22046 0
 22043  22044  22045 -1025 -22047 0
 22043  22044  22045 -1025  22048 0

c  1+1 --> 2
c    (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0 ∧  p_1025) -> (-b^{205, 6}_2 ∧  b^{205, 6}_1 ∧ -b^{205, 6}_0)
c  in CNF:
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_2
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨  b^{205, 6}_1
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ -p_1025 ∨ -b^{205, 6}_0
c  in DIMACS:
 22043  22044 -22045 -1025 -22046 0
 22043  22044 -22045 -1025  22047 0
 22043  22044 -22045 -1025 -22048 0

c  2+1 --> break 
c    (-b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧  p_1025) -> break
c  in CNF:
c     b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ -p_1025 ∨ break
c  in DIMACS:
 22043 -22044  22045 -1025 1162 0


c  2-1 --> 1
c    (-b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧ -p_1025) -> (-b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧  b^{205, 6}_0)
c  in CNF:
c     b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_2
c     b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_1
c     b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨  b^{205, 6}_0
c  in DIMACS:
 22043 -22044  22045  1025 -22046 0
 22043 -22044  22045  1025 -22047 0
 22043 -22044  22045  1025  22048 0

c  1-1 --> 0
c    (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0 ∧ -p_1025) -> (-b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧ -b^{205, 6}_0)
c  in CNF:
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_2
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_1
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_0
c  in DIMACS:
 22043  22044 -22045  1025 -22046 0
 22043  22044 -22045  1025 -22047 0
 22043  22044 -22045  1025 -22048 0

c  0-1 --> -1
c    (-b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧ -p_1025) -> ( b^{205, 6}_2 ∧ -b^{205, 6}_1 ∧  b^{205, 6}_0)
c  in CNF:
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨  b^{205, 6}_2
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_1
c     b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨  b^{205, 6}_0
c  in DIMACS:
 22043  22044  22045  1025  22046 0
 22043  22044  22045  1025 -22047 0
 22043  22044  22045  1025  22048 0

c  -1-1 --> -2
c    ( b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧  b^{205, 5}_0 ∧ -p_1025) -> ( b^{205, 6}_2 ∧  b^{205, 6}_1 ∧ -b^{205, 6}_0)
c  in CNF:
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨  b^{205, 6}_2
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨  b^{205, 6}_1
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨  p_1025 ∨ -b^{205, 6}_0
c  in DIMACS:
-22043  22044 -22045  1025  22046 0
-22043  22044 -22045  1025  22047 0
-22043  22044 -22045  1025 -22048 0

c  -2-1 --> break 
c    ( b^{205, 5}_2 ∧  b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧ -p_1025) -> break
c  in CNF:
c    -b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨  b^{205, 5}_0 ∨  p_1025 ∨ break
c  in DIMACS:
-22043 -22044  22045  1025 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{205, 5}_2 ∧ -b^{205, 5}_1 ∧ -b^{205, 5}_0 ∧ true) 
c  in CNF:
c    -b^{205, 5}_2 ∨  b^{205, 5}_1 ∨  b^{205, 5}_0 ∨ false 
c  in DIMACS:
-22043  22044  22045  0

c  3 does not represent an automaton state.
c    -(-b^{205, 5}_2 ∧  b^{205, 5}_1 ∧  b^{205, 5}_0 ∧ true) 
c  in CNF:
c     b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ false 
c  in DIMACS:
 22043 -22044 -22045  0
c  -3 does not represent an automaton state.
c    -( b^{205, 5}_2 ∧  b^{205, 5}_1 ∧  b^{205, 5}_0 ∧ true) 
c  in CNF:
c    -b^{205, 5}_2 ∨ -b^{205, 5}_1 ∨ -b^{205, 5}_0 ∨ false 
c  in DIMACS:
-22043 -22044 -22045  0

c INIT for k = 206
c    -b^{206, 1}_2
c    -b^{206, 1}_1
c    -b^{206, 1}_0
c  in DIMACS:
-22049 0
-22050 0
-22051 0

c Transitions for k = 206
c i = 1
c  -2+1 --> -1
c    ( b^{206, 1}_2 ∧  b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧  p_206) -> ( b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0)
c  in CNF:
c    -b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨  b^{206, 2}_2
c    -b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_1
c    -b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨  b^{206, 2}_0
c  in DIMACS:
-22049 -22050  22051 -206  22052 0
-22049 -22050  22051 -206 -22053 0
-22049 -22050  22051 -206  22054 0

c  -1+1 --> 0
c    ( b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧  b^{206, 1}_0 ∧  p_206) -> (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧ -b^{206, 2}_0)
c  in CNF:
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_2
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_1
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_0
c  in DIMACS:
-22049  22050 -22051 -206 -22052 0
-22049  22050 -22051 -206 -22053 0
-22049  22050 -22051 -206 -22054 0

c  0+1 --> 1
c    (-b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧  p_206) -> (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0)
c  in CNF:
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_2
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_1
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨  b^{206, 2}_0
c  in DIMACS:
 22049  22050  22051 -206 -22052 0
 22049  22050  22051 -206 -22053 0
 22049  22050  22051 -206  22054 0

c  1+1 --> 2
c    (-b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧  b^{206, 1}_0 ∧  p_206) -> (-b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0)
c  in CNF:
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_2
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨  b^{206, 2}_1
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ -p_206 ∨ -b^{206, 2}_0
c  in DIMACS:
 22049  22050 -22051 -206 -22052 0
 22049  22050 -22051 -206  22053 0
 22049  22050 -22051 -206 -22054 0

c  2+1 --> break 
c    (-b^{206, 1}_2 ∧  b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧  p_206) -> break
c  in CNF:
c     b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ -p_206 ∨ break
c  in DIMACS:
 22049 -22050  22051 -206 1162 0


c  2-1 --> 1
c    (-b^{206, 1}_2 ∧  b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧ -p_206) -> (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0)
c  in CNF:
c     b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_2
c     b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_1
c     b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨  b^{206, 2}_0
c  in DIMACS:
 22049 -22050  22051  206 -22052 0
 22049 -22050  22051  206 -22053 0
 22049 -22050  22051  206  22054 0

c  1-1 --> 0
c    (-b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧  b^{206, 1}_0 ∧ -p_206) -> (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧ -b^{206, 2}_0)
c  in CNF:
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_2
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_1
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_0
c  in DIMACS:
 22049  22050 -22051  206 -22052 0
 22049  22050 -22051  206 -22053 0
 22049  22050 -22051  206 -22054 0

c  0-1 --> -1
c    (-b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧ -p_206) -> ( b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0)
c  in CNF:
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨  b^{206, 2}_2
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_1
c     b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨  b^{206, 2}_0
c  in DIMACS:
 22049  22050  22051  206  22052 0
 22049  22050  22051  206 -22053 0
 22049  22050  22051  206  22054 0

c  -1-1 --> -2
c    ( b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧  b^{206, 1}_0 ∧ -p_206) -> ( b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0)
c  in CNF:
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨  b^{206, 2}_2
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨  b^{206, 2}_1
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨  p_206 ∨ -b^{206, 2}_0
c  in DIMACS:
-22049  22050 -22051  206  22052 0
-22049  22050 -22051  206  22053 0
-22049  22050 -22051  206 -22054 0

c  -2-1 --> break 
c    ( b^{206, 1}_2 ∧  b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧ -p_206) -> break
c  in CNF:
c    -b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨  b^{206, 1}_0 ∨  p_206 ∨ break
c  in DIMACS:
-22049 -22050  22051  206 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{206, 1}_2 ∧ -b^{206, 1}_1 ∧ -b^{206, 1}_0 ∧ true) 
c  in CNF:
c    -b^{206, 1}_2 ∨  b^{206, 1}_1 ∨  b^{206, 1}_0 ∨ false 
c  in DIMACS:
-22049  22050  22051  0

c  3 does not represent an automaton state.
c    -(-b^{206, 1}_2 ∧  b^{206, 1}_1 ∧  b^{206, 1}_0 ∧ true) 
c  in CNF:
c     b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ false 
c  in DIMACS:
 22049 -22050 -22051  0
c  -3 does not represent an automaton state.
c    -( b^{206, 1}_2 ∧  b^{206, 1}_1 ∧  b^{206, 1}_0 ∧ true) 
c  in CNF:
c    -b^{206, 1}_2 ∨ -b^{206, 1}_1 ∨ -b^{206, 1}_0 ∨ false 
c  in DIMACS:
-22049 -22050 -22051  0

c i = 2
c  -2+1 --> -1
c    ( b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧  p_412) -> ( b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0)
c  in CNF:
c    -b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨  b^{206, 3}_2
c    -b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_1
c    -b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨  b^{206, 3}_0
c  in DIMACS:
-22052 -22053  22054 -412  22055 0
-22052 -22053  22054 -412 -22056 0
-22052 -22053  22054 -412  22057 0

c  -1+1 --> 0
c    ( b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0 ∧  p_412) -> (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧ -b^{206, 3}_0)
c  in CNF:
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_2
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_1
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_0
c  in DIMACS:
-22052  22053 -22054 -412 -22055 0
-22052  22053 -22054 -412 -22056 0
-22052  22053 -22054 -412 -22057 0

c  0+1 --> 1
c    (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧  p_412) -> (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0)
c  in CNF:
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_2
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_1
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨  b^{206, 3}_0
c  in DIMACS:
 22052  22053  22054 -412 -22055 0
 22052  22053  22054 -412 -22056 0
 22052  22053  22054 -412  22057 0

c  1+1 --> 2
c    (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0 ∧  p_412) -> (-b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0)
c  in CNF:
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_2
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨  b^{206, 3}_1
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ -p_412 ∨ -b^{206, 3}_0
c  in DIMACS:
 22052  22053 -22054 -412 -22055 0
 22052  22053 -22054 -412  22056 0
 22052  22053 -22054 -412 -22057 0

c  2+1 --> break 
c    (-b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧  p_412) -> break
c  in CNF:
c     b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ -p_412 ∨ break
c  in DIMACS:
 22052 -22053  22054 -412 1162 0


c  2-1 --> 1
c    (-b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧ -p_412) -> (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0)
c  in CNF:
c     b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_2
c     b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_1
c     b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨  b^{206, 3}_0
c  in DIMACS:
 22052 -22053  22054  412 -22055 0
 22052 -22053  22054  412 -22056 0
 22052 -22053  22054  412  22057 0

c  1-1 --> 0
c    (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0 ∧ -p_412) -> (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧ -b^{206, 3}_0)
c  in CNF:
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_2
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_1
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_0
c  in DIMACS:
 22052  22053 -22054  412 -22055 0
 22052  22053 -22054  412 -22056 0
 22052  22053 -22054  412 -22057 0

c  0-1 --> -1
c    (-b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧ -p_412) -> ( b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0)
c  in CNF:
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨  b^{206, 3}_2
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_1
c     b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨  b^{206, 3}_0
c  in DIMACS:
 22052  22053  22054  412  22055 0
 22052  22053  22054  412 -22056 0
 22052  22053  22054  412  22057 0

c  -1-1 --> -2
c    ( b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧  b^{206, 2}_0 ∧ -p_412) -> ( b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0)
c  in CNF:
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨  b^{206, 3}_2
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨  b^{206, 3}_1
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨  p_412 ∨ -b^{206, 3}_0
c  in DIMACS:
-22052  22053 -22054  412  22055 0
-22052  22053 -22054  412  22056 0
-22052  22053 -22054  412 -22057 0

c  -2-1 --> break 
c    ( b^{206, 2}_2 ∧  b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧ -p_412) -> break
c  in CNF:
c    -b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨  b^{206, 2}_0 ∨  p_412 ∨ break
c  in DIMACS:
-22052 -22053  22054  412 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{206, 2}_2 ∧ -b^{206, 2}_1 ∧ -b^{206, 2}_0 ∧ true) 
c  in CNF:
c    -b^{206, 2}_2 ∨  b^{206, 2}_1 ∨  b^{206, 2}_0 ∨ false 
c  in DIMACS:
-22052  22053  22054  0

c  3 does not represent an automaton state.
c    -(-b^{206, 2}_2 ∧  b^{206, 2}_1 ∧  b^{206, 2}_0 ∧ true) 
c  in CNF:
c     b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ false 
c  in DIMACS:
 22052 -22053 -22054  0
c  -3 does not represent an automaton state.
c    -( b^{206, 2}_2 ∧  b^{206, 2}_1 ∧  b^{206, 2}_0 ∧ true) 
c  in CNF:
c    -b^{206, 2}_2 ∨ -b^{206, 2}_1 ∨ -b^{206, 2}_0 ∨ false 
c  in DIMACS:
-22052 -22053 -22054  0

c i = 3
c  -2+1 --> -1
c    ( b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧  p_618) -> ( b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0)
c  in CNF:
c    -b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨  b^{206, 4}_2
c    -b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_1
c    -b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨  b^{206, 4}_0
c  in DIMACS:
-22055 -22056  22057 -618  22058 0
-22055 -22056  22057 -618 -22059 0
-22055 -22056  22057 -618  22060 0

c  -1+1 --> 0
c    ( b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0 ∧  p_618) -> (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧ -b^{206, 4}_0)
c  in CNF:
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_2
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_1
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_0
c  in DIMACS:
-22055  22056 -22057 -618 -22058 0
-22055  22056 -22057 -618 -22059 0
-22055  22056 -22057 -618 -22060 0

c  0+1 --> 1
c    (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧  p_618) -> (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0)
c  in CNF:
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_2
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_1
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨  b^{206, 4}_0
c  in DIMACS:
 22055  22056  22057 -618 -22058 0
 22055  22056  22057 -618 -22059 0
 22055  22056  22057 -618  22060 0

c  1+1 --> 2
c    (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0 ∧  p_618) -> (-b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0)
c  in CNF:
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_2
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨  b^{206, 4}_1
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ -p_618 ∨ -b^{206, 4}_0
c  in DIMACS:
 22055  22056 -22057 -618 -22058 0
 22055  22056 -22057 -618  22059 0
 22055  22056 -22057 -618 -22060 0

c  2+1 --> break 
c    (-b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧  p_618) -> break
c  in CNF:
c     b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 22055 -22056  22057 -618 1162 0


c  2-1 --> 1
c    (-b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧ -p_618) -> (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0)
c  in CNF:
c     b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_2
c     b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_1
c     b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨  b^{206, 4}_0
c  in DIMACS:
 22055 -22056  22057  618 -22058 0
 22055 -22056  22057  618 -22059 0
 22055 -22056  22057  618  22060 0

c  1-1 --> 0
c    (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0 ∧ -p_618) -> (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧ -b^{206, 4}_0)
c  in CNF:
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_2
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_1
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_0
c  in DIMACS:
 22055  22056 -22057  618 -22058 0
 22055  22056 -22057  618 -22059 0
 22055  22056 -22057  618 -22060 0

c  0-1 --> -1
c    (-b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧ -p_618) -> ( b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0)
c  in CNF:
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨  b^{206, 4}_2
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_1
c     b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨  b^{206, 4}_0
c  in DIMACS:
 22055  22056  22057  618  22058 0
 22055  22056  22057  618 -22059 0
 22055  22056  22057  618  22060 0

c  -1-1 --> -2
c    ( b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧  b^{206, 3}_0 ∧ -p_618) -> ( b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0)
c  in CNF:
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨  b^{206, 4}_2
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨  b^{206, 4}_1
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨  p_618 ∨ -b^{206, 4}_0
c  in DIMACS:
-22055  22056 -22057  618  22058 0
-22055  22056 -22057  618  22059 0
-22055  22056 -22057  618 -22060 0

c  -2-1 --> break 
c    ( b^{206, 3}_2 ∧  b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨  b^{206, 3}_0 ∨  p_618 ∨ break
c  in DIMACS:
-22055 -22056  22057  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{206, 3}_2 ∧ -b^{206, 3}_1 ∧ -b^{206, 3}_0 ∧ true) 
c  in CNF:
c    -b^{206, 3}_2 ∨  b^{206, 3}_1 ∨  b^{206, 3}_0 ∨ false 
c  in DIMACS:
-22055  22056  22057  0

c  3 does not represent an automaton state.
c    -(-b^{206, 3}_2 ∧  b^{206, 3}_1 ∧  b^{206, 3}_0 ∧ true) 
c  in CNF:
c     b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ false 
c  in DIMACS:
 22055 -22056 -22057  0
c  -3 does not represent an automaton state.
c    -( b^{206, 3}_2 ∧  b^{206, 3}_1 ∧  b^{206, 3}_0 ∧ true) 
c  in CNF:
c    -b^{206, 3}_2 ∨ -b^{206, 3}_1 ∨ -b^{206, 3}_0 ∨ false 
c  in DIMACS:
-22055 -22056 -22057  0

c i = 4
c  -2+1 --> -1
c    ( b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧  p_824) -> ( b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0)
c  in CNF:
c    -b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨  b^{206, 5}_2
c    -b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_1
c    -b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨  b^{206, 5}_0
c  in DIMACS:
-22058 -22059  22060 -824  22061 0
-22058 -22059  22060 -824 -22062 0
-22058 -22059  22060 -824  22063 0

c  -1+1 --> 0
c    ( b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0 ∧  p_824) -> (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧ -b^{206, 5}_0)
c  in CNF:
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_2
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_1
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_0
c  in DIMACS:
-22058  22059 -22060 -824 -22061 0
-22058  22059 -22060 -824 -22062 0
-22058  22059 -22060 -824 -22063 0

c  0+1 --> 1
c    (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧  p_824) -> (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0)
c  in CNF:
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_2
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_1
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨  b^{206, 5}_0
c  in DIMACS:
 22058  22059  22060 -824 -22061 0
 22058  22059  22060 -824 -22062 0
 22058  22059  22060 -824  22063 0

c  1+1 --> 2
c    (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0 ∧  p_824) -> (-b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0)
c  in CNF:
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_2
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨  b^{206, 5}_1
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ -p_824 ∨ -b^{206, 5}_0
c  in DIMACS:
 22058  22059 -22060 -824 -22061 0
 22058  22059 -22060 -824  22062 0
 22058  22059 -22060 -824 -22063 0

c  2+1 --> break 
c    (-b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧  p_824) -> break
c  in CNF:
c     b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ -p_824 ∨ break
c  in DIMACS:
 22058 -22059  22060 -824 1162 0


c  2-1 --> 1
c    (-b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧ -p_824) -> (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0)
c  in CNF:
c     b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_2
c     b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_1
c     b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨  b^{206, 5}_0
c  in DIMACS:
 22058 -22059  22060  824 -22061 0
 22058 -22059  22060  824 -22062 0
 22058 -22059  22060  824  22063 0

c  1-1 --> 0
c    (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0 ∧ -p_824) -> (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧ -b^{206, 5}_0)
c  in CNF:
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_2
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_1
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_0
c  in DIMACS:
 22058  22059 -22060  824 -22061 0
 22058  22059 -22060  824 -22062 0
 22058  22059 -22060  824 -22063 0

c  0-1 --> -1
c    (-b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧ -p_824) -> ( b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0)
c  in CNF:
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨  b^{206, 5}_2
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_1
c     b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨  b^{206, 5}_0
c  in DIMACS:
 22058  22059  22060  824  22061 0
 22058  22059  22060  824 -22062 0
 22058  22059  22060  824  22063 0

c  -1-1 --> -2
c    ( b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧  b^{206, 4}_0 ∧ -p_824) -> ( b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0)
c  in CNF:
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨  b^{206, 5}_2
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨  b^{206, 5}_1
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨  p_824 ∨ -b^{206, 5}_0
c  in DIMACS:
-22058  22059 -22060  824  22061 0
-22058  22059 -22060  824  22062 0
-22058  22059 -22060  824 -22063 0

c  -2-1 --> break 
c    ( b^{206, 4}_2 ∧  b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧ -p_824) -> break
c  in CNF:
c    -b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨  b^{206, 4}_0 ∨  p_824 ∨ break
c  in DIMACS:
-22058 -22059  22060  824 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{206, 4}_2 ∧ -b^{206, 4}_1 ∧ -b^{206, 4}_0 ∧ true) 
c  in CNF:
c    -b^{206, 4}_2 ∨  b^{206, 4}_1 ∨  b^{206, 4}_0 ∨ false 
c  in DIMACS:
-22058  22059  22060  0

c  3 does not represent an automaton state.
c    -(-b^{206, 4}_2 ∧  b^{206, 4}_1 ∧  b^{206, 4}_0 ∧ true) 
c  in CNF:
c     b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ false 
c  in DIMACS:
 22058 -22059 -22060  0
c  -3 does not represent an automaton state.
c    -( b^{206, 4}_2 ∧  b^{206, 4}_1 ∧  b^{206, 4}_0 ∧ true) 
c  in CNF:
c    -b^{206, 4}_2 ∨ -b^{206, 4}_1 ∨ -b^{206, 4}_0 ∨ false 
c  in DIMACS:
-22058 -22059 -22060  0

c i = 5
c  -2+1 --> -1
c    ( b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧  p_1030) -> ( b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧  b^{206, 6}_0)
c  in CNF:
c    -b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨  b^{206, 6}_2
c    -b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_1
c    -b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨  b^{206, 6}_0
c  in DIMACS:
-22061 -22062  22063 -1030  22064 0
-22061 -22062  22063 -1030 -22065 0
-22061 -22062  22063 -1030  22066 0

c  -1+1 --> 0
c    ( b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0 ∧  p_1030) -> (-b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧ -b^{206, 6}_0)
c  in CNF:
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_2
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_1
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_0
c  in DIMACS:
-22061  22062 -22063 -1030 -22064 0
-22061  22062 -22063 -1030 -22065 0
-22061  22062 -22063 -1030 -22066 0

c  0+1 --> 1
c    (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧  p_1030) -> (-b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧  b^{206, 6}_0)
c  in CNF:
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_2
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_1
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨  b^{206, 6}_0
c  in DIMACS:
 22061  22062  22063 -1030 -22064 0
 22061  22062  22063 -1030 -22065 0
 22061  22062  22063 -1030  22066 0

c  1+1 --> 2
c    (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0 ∧  p_1030) -> (-b^{206, 6}_2 ∧  b^{206, 6}_1 ∧ -b^{206, 6}_0)
c  in CNF:
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_2
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨  b^{206, 6}_1
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ -p_1030 ∨ -b^{206, 6}_0
c  in DIMACS:
 22061  22062 -22063 -1030 -22064 0
 22061  22062 -22063 -1030  22065 0
 22061  22062 -22063 -1030 -22066 0

c  2+1 --> break 
c    (-b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧  p_1030) -> break
c  in CNF:
c     b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ -p_1030 ∨ break
c  in DIMACS:
 22061 -22062  22063 -1030 1162 0


c  2-1 --> 1
c    (-b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧ -p_1030) -> (-b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧  b^{206, 6}_0)
c  in CNF:
c     b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_2
c     b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_1
c     b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨  b^{206, 6}_0
c  in DIMACS:
 22061 -22062  22063  1030 -22064 0
 22061 -22062  22063  1030 -22065 0
 22061 -22062  22063  1030  22066 0

c  1-1 --> 0
c    (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0 ∧ -p_1030) -> (-b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧ -b^{206, 6}_0)
c  in CNF:
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_2
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_1
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_0
c  in DIMACS:
 22061  22062 -22063  1030 -22064 0
 22061  22062 -22063  1030 -22065 0
 22061  22062 -22063  1030 -22066 0

c  0-1 --> -1
c    (-b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧ -p_1030) -> ( b^{206, 6}_2 ∧ -b^{206, 6}_1 ∧  b^{206, 6}_0)
c  in CNF:
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨  b^{206, 6}_2
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_1
c     b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨  b^{206, 6}_0
c  in DIMACS:
 22061  22062  22063  1030  22064 0
 22061  22062  22063  1030 -22065 0
 22061  22062  22063  1030  22066 0

c  -1-1 --> -2
c    ( b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧  b^{206, 5}_0 ∧ -p_1030) -> ( b^{206, 6}_2 ∧  b^{206, 6}_1 ∧ -b^{206, 6}_0)
c  in CNF:
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨  b^{206, 6}_2
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨  b^{206, 6}_1
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨  p_1030 ∨ -b^{206, 6}_0
c  in DIMACS:
-22061  22062 -22063  1030  22064 0
-22061  22062 -22063  1030  22065 0
-22061  22062 -22063  1030 -22066 0

c  -2-1 --> break 
c    ( b^{206, 5}_2 ∧  b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧ -p_1030) -> break
c  in CNF:
c    -b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨  b^{206, 5}_0 ∨  p_1030 ∨ break
c  in DIMACS:
-22061 -22062  22063  1030 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{206, 5}_2 ∧ -b^{206, 5}_1 ∧ -b^{206, 5}_0 ∧ true) 
c  in CNF:
c    -b^{206, 5}_2 ∨  b^{206, 5}_1 ∨  b^{206, 5}_0 ∨ false 
c  in DIMACS:
-22061  22062  22063  0

c  3 does not represent an automaton state.
c    -(-b^{206, 5}_2 ∧  b^{206, 5}_1 ∧  b^{206, 5}_0 ∧ true) 
c  in CNF:
c     b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ false 
c  in DIMACS:
 22061 -22062 -22063  0
c  -3 does not represent an automaton state.
c    -( b^{206, 5}_2 ∧  b^{206, 5}_1 ∧  b^{206, 5}_0 ∧ true) 
c  in CNF:
c    -b^{206, 5}_2 ∨ -b^{206, 5}_1 ∨ -b^{206, 5}_0 ∨ false 
c  in DIMACS:
-22061 -22062 -22063  0

c INIT for k = 207
c    -b^{207, 1}_2
c    -b^{207, 1}_1
c    -b^{207, 1}_0
c  in DIMACS:
-22067 0
-22068 0
-22069 0

c Transitions for k = 207
c i = 1
c  -2+1 --> -1
c    ( b^{207, 1}_2 ∧  b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧  p_207) -> ( b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0)
c  in CNF:
c    -b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨  b^{207, 2}_2
c    -b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_1
c    -b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨  b^{207, 2}_0
c  in DIMACS:
-22067 -22068  22069 -207  22070 0
-22067 -22068  22069 -207 -22071 0
-22067 -22068  22069 -207  22072 0

c  -1+1 --> 0
c    ( b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧  b^{207, 1}_0 ∧  p_207) -> (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧ -b^{207, 2}_0)
c  in CNF:
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_2
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_1
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_0
c  in DIMACS:
-22067  22068 -22069 -207 -22070 0
-22067  22068 -22069 -207 -22071 0
-22067  22068 -22069 -207 -22072 0

c  0+1 --> 1
c    (-b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧  p_207) -> (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0)
c  in CNF:
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_2
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_1
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨  b^{207, 2}_0
c  in DIMACS:
 22067  22068  22069 -207 -22070 0
 22067  22068  22069 -207 -22071 0
 22067  22068  22069 -207  22072 0

c  1+1 --> 2
c    (-b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧  b^{207, 1}_0 ∧  p_207) -> (-b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0)
c  in CNF:
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_2
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨  b^{207, 2}_1
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ -p_207 ∨ -b^{207, 2}_0
c  in DIMACS:
 22067  22068 -22069 -207 -22070 0
 22067  22068 -22069 -207  22071 0
 22067  22068 -22069 -207 -22072 0

c  2+1 --> break 
c    (-b^{207, 1}_2 ∧  b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧  p_207) -> break
c  in CNF:
c     b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ -p_207 ∨ break
c  in DIMACS:
 22067 -22068  22069 -207 1162 0


c  2-1 --> 1
c    (-b^{207, 1}_2 ∧  b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧ -p_207) -> (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0)
c  in CNF:
c     b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_2
c     b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_1
c     b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨  b^{207, 2}_0
c  in DIMACS:
 22067 -22068  22069  207 -22070 0
 22067 -22068  22069  207 -22071 0
 22067 -22068  22069  207  22072 0

c  1-1 --> 0
c    (-b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧  b^{207, 1}_0 ∧ -p_207) -> (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧ -b^{207, 2}_0)
c  in CNF:
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_2
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_1
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_0
c  in DIMACS:
 22067  22068 -22069  207 -22070 0
 22067  22068 -22069  207 -22071 0
 22067  22068 -22069  207 -22072 0

c  0-1 --> -1
c    (-b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧ -p_207) -> ( b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0)
c  in CNF:
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨  b^{207, 2}_2
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_1
c     b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨  b^{207, 2}_0
c  in DIMACS:
 22067  22068  22069  207  22070 0
 22067  22068  22069  207 -22071 0
 22067  22068  22069  207  22072 0

c  -1-1 --> -2
c    ( b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧  b^{207, 1}_0 ∧ -p_207) -> ( b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0)
c  in CNF:
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨  b^{207, 2}_2
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨  b^{207, 2}_1
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨  p_207 ∨ -b^{207, 2}_0
c  in DIMACS:
-22067  22068 -22069  207  22070 0
-22067  22068 -22069  207  22071 0
-22067  22068 -22069  207 -22072 0

c  -2-1 --> break 
c    ( b^{207, 1}_2 ∧  b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧ -p_207) -> break
c  in CNF:
c    -b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨  b^{207, 1}_0 ∨  p_207 ∨ break
c  in DIMACS:
-22067 -22068  22069  207 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{207, 1}_2 ∧ -b^{207, 1}_1 ∧ -b^{207, 1}_0 ∧ true) 
c  in CNF:
c    -b^{207, 1}_2 ∨  b^{207, 1}_1 ∨  b^{207, 1}_0 ∨ false 
c  in DIMACS:
-22067  22068  22069  0

c  3 does not represent an automaton state.
c    -(-b^{207, 1}_2 ∧  b^{207, 1}_1 ∧  b^{207, 1}_0 ∧ true) 
c  in CNF:
c     b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ false 
c  in DIMACS:
 22067 -22068 -22069  0
c  -3 does not represent an automaton state.
c    -( b^{207, 1}_2 ∧  b^{207, 1}_1 ∧  b^{207, 1}_0 ∧ true) 
c  in CNF:
c    -b^{207, 1}_2 ∨ -b^{207, 1}_1 ∨ -b^{207, 1}_0 ∨ false 
c  in DIMACS:
-22067 -22068 -22069  0

c i = 2
c  -2+1 --> -1
c    ( b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧  p_414) -> ( b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0)
c  in CNF:
c    -b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨  b^{207, 3}_2
c    -b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_1
c    -b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨  b^{207, 3}_0
c  in DIMACS:
-22070 -22071  22072 -414  22073 0
-22070 -22071  22072 -414 -22074 0
-22070 -22071  22072 -414  22075 0

c  -1+1 --> 0
c    ( b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0 ∧  p_414) -> (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧ -b^{207, 3}_0)
c  in CNF:
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_2
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_1
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_0
c  in DIMACS:
-22070  22071 -22072 -414 -22073 0
-22070  22071 -22072 -414 -22074 0
-22070  22071 -22072 -414 -22075 0

c  0+1 --> 1
c    (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧  p_414) -> (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0)
c  in CNF:
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_2
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_1
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨  b^{207, 3}_0
c  in DIMACS:
 22070  22071  22072 -414 -22073 0
 22070  22071  22072 -414 -22074 0
 22070  22071  22072 -414  22075 0

c  1+1 --> 2
c    (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0 ∧  p_414) -> (-b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0)
c  in CNF:
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_2
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨  b^{207, 3}_1
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ -p_414 ∨ -b^{207, 3}_0
c  in DIMACS:
 22070  22071 -22072 -414 -22073 0
 22070  22071 -22072 -414  22074 0
 22070  22071 -22072 -414 -22075 0

c  2+1 --> break 
c    (-b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧  p_414) -> break
c  in CNF:
c     b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ -p_414 ∨ break
c  in DIMACS:
 22070 -22071  22072 -414 1162 0


c  2-1 --> 1
c    (-b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧ -p_414) -> (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0)
c  in CNF:
c     b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_2
c     b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_1
c     b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨  b^{207, 3}_0
c  in DIMACS:
 22070 -22071  22072  414 -22073 0
 22070 -22071  22072  414 -22074 0
 22070 -22071  22072  414  22075 0

c  1-1 --> 0
c    (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0 ∧ -p_414) -> (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧ -b^{207, 3}_0)
c  in CNF:
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_2
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_1
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_0
c  in DIMACS:
 22070  22071 -22072  414 -22073 0
 22070  22071 -22072  414 -22074 0
 22070  22071 -22072  414 -22075 0

c  0-1 --> -1
c    (-b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧ -p_414) -> ( b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0)
c  in CNF:
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨  b^{207, 3}_2
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_1
c     b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨  b^{207, 3}_0
c  in DIMACS:
 22070  22071  22072  414  22073 0
 22070  22071  22072  414 -22074 0
 22070  22071  22072  414  22075 0

c  -1-1 --> -2
c    ( b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧  b^{207, 2}_0 ∧ -p_414) -> ( b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0)
c  in CNF:
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨  b^{207, 3}_2
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨  b^{207, 3}_1
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨  p_414 ∨ -b^{207, 3}_0
c  in DIMACS:
-22070  22071 -22072  414  22073 0
-22070  22071 -22072  414  22074 0
-22070  22071 -22072  414 -22075 0

c  -2-1 --> break 
c    ( b^{207, 2}_2 ∧  b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧ -p_414) -> break
c  in CNF:
c    -b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨  b^{207, 2}_0 ∨  p_414 ∨ break
c  in DIMACS:
-22070 -22071  22072  414 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{207, 2}_2 ∧ -b^{207, 2}_1 ∧ -b^{207, 2}_0 ∧ true) 
c  in CNF:
c    -b^{207, 2}_2 ∨  b^{207, 2}_1 ∨  b^{207, 2}_0 ∨ false 
c  in DIMACS:
-22070  22071  22072  0

c  3 does not represent an automaton state.
c    -(-b^{207, 2}_2 ∧  b^{207, 2}_1 ∧  b^{207, 2}_0 ∧ true) 
c  in CNF:
c     b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ false 
c  in DIMACS:
 22070 -22071 -22072  0
c  -3 does not represent an automaton state.
c    -( b^{207, 2}_2 ∧  b^{207, 2}_1 ∧  b^{207, 2}_0 ∧ true) 
c  in CNF:
c    -b^{207, 2}_2 ∨ -b^{207, 2}_1 ∨ -b^{207, 2}_0 ∨ false 
c  in DIMACS:
-22070 -22071 -22072  0

c i = 3
c  -2+1 --> -1
c    ( b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧  p_621) -> ( b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0)
c  in CNF:
c    -b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨  b^{207, 4}_2
c    -b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_1
c    -b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨  b^{207, 4}_0
c  in DIMACS:
-22073 -22074  22075 -621  22076 0
-22073 -22074  22075 -621 -22077 0
-22073 -22074  22075 -621  22078 0

c  -1+1 --> 0
c    ( b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0 ∧  p_621) -> (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧ -b^{207, 4}_0)
c  in CNF:
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_2
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_1
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_0
c  in DIMACS:
-22073  22074 -22075 -621 -22076 0
-22073  22074 -22075 -621 -22077 0
-22073  22074 -22075 -621 -22078 0

c  0+1 --> 1
c    (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧  p_621) -> (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0)
c  in CNF:
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_2
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_1
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨  b^{207, 4}_0
c  in DIMACS:
 22073  22074  22075 -621 -22076 0
 22073  22074  22075 -621 -22077 0
 22073  22074  22075 -621  22078 0

c  1+1 --> 2
c    (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0 ∧  p_621) -> (-b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0)
c  in CNF:
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_2
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨  b^{207, 4}_1
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ -p_621 ∨ -b^{207, 4}_0
c  in DIMACS:
 22073  22074 -22075 -621 -22076 0
 22073  22074 -22075 -621  22077 0
 22073  22074 -22075 -621 -22078 0

c  2+1 --> break 
c    (-b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧  p_621) -> break
c  in CNF:
c     b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ -p_621 ∨ break
c  in DIMACS:
 22073 -22074  22075 -621 1162 0


c  2-1 --> 1
c    (-b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧ -p_621) -> (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0)
c  in CNF:
c     b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_2
c     b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_1
c     b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨  b^{207, 4}_0
c  in DIMACS:
 22073 -22074  22075  621 -22076 0
 22073 -22074  22075  621 -22077 0
 22073 -22074  22075  621  22078 0

c  1-1 --> 0
c    (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0 ∧ -p_621) -> (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧ -b^{207, 4}_0)
c  in CNF:
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_2
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_1
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_0
c  in DIMACS:
 22073  22074 -22075  621 -22076 0
 22073  22074 -22075  621 -22077 0
 22073  22074 -22075  621 -22078 0

c  0-1 --> -1
c    (-b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧ -p_621) -> ( b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0)
c  in CNF:
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨  b^{207, 4}_2
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_1
c     b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨  b^{207, 4}_0
c  in DIMACS:
 22073  22074  22075  621  22076 0
 22073  22074  22075  621 -22077 0
 22073  22074  22075  621  22078 0

c  -1-1 --> -2
c    ( b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧  b^{207, 3}_0 ∧ -p_621) -> ( b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0)
c  in CNF:
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨  b^{207, 4}_2
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨  b^{207, 4}_1
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨  p_621 ∨ -b^{207, 4}_0
c  in DIMACS:
-22073  22074 -22075  621  22076 0
-22073  22074 -22075  621  22077 0
-22073  22074 -22075  621 -22078 0

c  -2-1 --> break 
c    ( b^{207, 3}_2 ∧  b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧ -p_621) -> break
c  in CNF:
c    -b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨  b^{207, 3}_0 ∨  p_621 ∨ break
c  in DIMACS:
-22073 -22074  22075  621 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{207, 3}_2 ∧ -b^{207, 3}_1 ∧ -b^{207, 3}_0 ∧ true) 
c  in CNF:
c    -b^{207, 3}_2 ∨  b^{207, 3}_1 ∨  b^{207, 3}_0 ∨ false 
c  in DIMACS:
-22073  22074  22075  0

c  3 does not represent an automaton state.
c    -(-b^{207, 3}_2 ∧  b^{207, 3}_1 ∧  b^{207, 3}_0 ∧ true) 
c  in CNF:
c     b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ false 
c  in DIMACS:
 22073 -22074 -22075  0
c  -3 does not represent an automaton state.
c    -( b^{207, 3}_2 ∧  b^{207, 3}_1 ∧  b^{207, 3}_0 ∧ true) 
c  in CNF:
c    -b^{207, 3}_2 ∨ -b^{207, 3}_1 ∨ -b^{207, 3}_0 ∨ false 
c  in DIMACS:
-22073 -22074 -22075  0

c i = 4
c  -2+1 --> -1
c    ( b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧  p_828) -> ( b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0)
c  in CNF:
c    -b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨  b^{207, 5}_2
c    -b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_1
c    -b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨  b^{207, 5}_0
c  in DIMACS:
-22076 -22077  22078 -828  22079 0
-22076 -22077  22078 -828 -22080 0
-22076 -22077  22078 -828  22081 0

c  -1+1 --> 0
c    ( b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0 ∧  p_828) -> (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧ -b^{207, 5}_0)
c  in CNF:
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_2
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_1
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_0
c  in DIMACS:
-22076  22077 -22078 -828 -22079 0
-22076  22077 -22078 -828 -22080 0
-22076  22077 -22078 -828 -22081 0

c  0+1 --> 1
c    (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧  p_828) -> (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0)
c  in CNF:
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_2
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_1
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨  b^{207, 5}_0
c  in DIMACS:
 22076  22077  22078 -828 -22079 0
 22076  22077  22078 -828 -22080 0
 22076  22077  22078 -828  22081 0

c  1+1 --> 2
c    (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0 ∧  p_828) -> (-b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0)
c  in CNF:
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_2
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨  b^{207, 5}_1
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ -p_828 ∨ -b^{207, 5}_0
c  in DIMACS:
 22076  22077 -22078 -828 -22079 0
 22076  22077 -22078 -828  22080 0
 22076  22077 -22078 -828 -22081 0

c  2+1 --> break 
c    (-b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧  p_828) -> break
c  in CNF:
c     b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 22076 -22077  22078 -828 1162 0


c  2-1 --> 1
c    (-b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧ -p_828) -> (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0)
c  in CNF:
c     b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_2
c     b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_1
c     b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨  b^{207, 5}_0
c  in DIMACS:
 22076 -22077  22078  828 -22079 0
 22076 -22077  22078  828 -22080 0
 22076 -22077  22078  828  22081 0

c  1-1 --> 0
c    (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0 ∧ -p_828) -> (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧ -b^{207, 5}_0)
c  in CNF:
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_2
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_1
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_0
c  in DIMACS:
 22076  22077 -22078  828 -22079 0
 22076  22077 -22078  828 -22080 0
 22076  22077 -22078  828 -22081 0

c  0-1 --> -1
c    (-b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧ -p_828) -> ( b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0)
c  in CNF:
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨  b^{207, 5}_2
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_1
c     b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨  b^{207, 5}_0
c  in DIMACS:
 22076  22077  22078  828  22079 0
 22076  22077  22078  828 -22080 0
 22076  22077  22078  828  22081 0

c  -1-1 --> -2
c    ( b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧  b^{207, 4}_0 ∧ -p_828) -> ( b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0)
c  in CNF:
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨  b^{207, 5}_2
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨  b^{207, 5}_1
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨  p_828 ∨ -b^{207, 5}_0
c  in DIMACS:
-22076  22077 -22078  828  22079 0
-22076  22077 -22078  828  22080 0
-22076  22077 -22078  828 -22081 0

c  -2-1 --> break 
c    ( b^{207, 4}_2 ∧  b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨  b^{207, 4}_0 ∨  p_828 ∨ break
c  in DIMACS:
-22076 -22077  22078  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{207, 4}_2 ∧ -b^{207, 4}_1 ∧ -b^{207, 4}_0 ∧ true) 
c  in CNF:
c    -b^{207, 4}_2 ∨  b^{207, 4}_1 ∨  b^{207, 4}_0 ∨ false 
c  in DIMACS:
-22076  22077  22078  0

c  3 does not represent an automaton state.
c    -(-b^{207, 4}_2 ∧  b^{207, 4}_1 ∧  b^{207, 4}_0 ∧ true) 
c  in CNF:
c     b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ false 
c  in DIMACS:
 22076 -22077 -22078  0
c  -3 does not represent an automaton state.
c    -( b^{207, 4}_2 ∧  b^{207, 4}_1 ∧  b^{207, 4}_0 ∧ true) 
c  in CNF:
c    -b^{207, 4}_2 ∨ -b^{207, 4}_1 ∨ -b^{207, 4}_0 ∨ false 
c  in DIMACS:
-22076 -22077 -22078  0

c i = 5
c  -2+1 --> -1
c    ( b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧  p_1035) -> ( b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧  b^{207, 6}_0)
c  in CNF:
c    -b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨  b^{207, 6}_2
c    -b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_1
c    -b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨  b^{207, 6}_0
c  in DIMACS:
-22079 -22080  22081 -1035  22082 0
-22079 -22080  22081 -1035 -22083 0
-22079 -22080  22081 -1035  22084 0

c  -1+1 --> 0
c    ( b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0 ∧  p_1035) -> (-b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧ -b^{207, 6}_0)
c  in CNF:
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_2
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_1
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_0
c  in DIMACS:
-22079  22080 -22081 -1035 -22082 0
-22079  22080 -22081 -1035 -22083 0
-22079  22080 -22081 -1035 -22084 0

c  0+1 --> 1
c    (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧  p_1035) -> (-b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧  b^{207, 6}_0)
c  in CNF:
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_2
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_1
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨  b^{207, 6}_0
c  in DIMACS:
 22079  22080  22081 -1035 -22082 0
 22079  22080  22081 -1035 -22083 0
 22079  22080  22081 -1035  22084 0

c  1+1 --> 2
c    (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0 ∧  p_1035) -> (-b^{207, 6}_2 ∧  b^{207, 6}_1 ∧ -b^{207, 6}_0)
c  in CNF:
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_2
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨  b^{207, 6}_1
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ -p_1035 ∨ -b^{207, 6}_0
c  in DIMACS:
 22079  22080 -22081 -1035 -22082 0
 22079  22080 -22081 -1035  22083 0
 22079  22080 -22081 -1035 -22084 0

c  2+1 --> break 
c    (-b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 22079 -22080  22081 -1035 1162 0


c  2-1 --> 1
c    (-b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧ -p_1035) -> (-b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧  b^{207, 6}_0)
c  in CNF:
c     b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_2
c     b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_1
c     b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨  b^{207, 6}_0
c  in DIMACS:
 22079 -22080  22081  1035 -22082 0
 22079 -22080  22081  1035 -22083 0
 22079 -22080  22081  1035  22084 0

c  1-1 --> 0
c    (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0 ∧ -p_1035) -> (-b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧ -b^{207, 6}_0)
c  in CNF:
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_2
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_1
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_0
c  in DIMACS:
 22079  22080 -22081  1035 -22082 0
 22079  22080 -22081  1035 -22083 0
 22079  22080 -22081  1035 -22084 0

c  0-1 --> -1
c    (-b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧ -p_1035) -> ( b^{207, 6}_2 ∧ -b^{207, 6}_1 ∧  b^{207, 6}_0)
c  in CNF:
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨  b^{207, 6}_2
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_1
c     b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨  b^{207, 6}_0
c  in DIMACS:
 22079  22080  22081  1035  22082 0
 22079  22080  22081  1035 -22083 0
 22079  22080  22081  1035  22084 0

c  -1-1 --> -2
c    ( b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧  b^{207, 5}_0 ∧ -p_1035) -> ( b^{207, 6}_2 ∧  b^{207, 6}_1 ∧ -b^{207, 6}_0)
c  in CNF:
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨  b^{207, 6}_2
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨  b^{207, 6}_1
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨  p_1035 ∨ -b^{207, 6}_0
c  in DIMACS:
-22079  22080 -22081  1035  22082 0
-22079  22080 -22081  1035  22083 0
-22079  22080 -22081  1035 -22084 0

c  -2-1 --> break 
c    ( b^{207, 5}_2 ∧  b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨  b^{207, 5}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-22079 -22080  22081  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{207, 5}_2 ∧ -b^{207, 5}_1 ∧ -b^{207, 5}_0 ∧ true) 
c  in CNF:
c    -b^{207, 5}_2 ∨  b^{207, 5}_1 ∨  b^{207, 5}_0 ∨ false 
c  in DIMACS:
-22079  22080  22081  0

c  3 does not represent an automaton state.
c    -(-b^{207, 5}_2 ∧  b^{207, 5}_1 ∧  b^{207, 5}_0 ∧ true) 
c  in CNF:
c     b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ false 
c  in DIMACS:
 22079 -22080 -22081  0
c  -3 does not represent an automaton state.
c    -( b^{207, 5}_2 ∧  b^{207, 5}_1 ∧  b^{207, 5}_0 ∧ true) 
c  in CNF:
c    -b^{207, 5}_2 ∨ -b^{207, 5}_1 ∨ -b^{207, 5}_0 ∨ false 
c  in DIMACS:
-22079 -22080 -22081  0

c INIT for k = 208
c    -b^{208, 1}_2
c    -b^{208, 1}_1
c    -b^{208, 1}_0
c  in DIMACS:
-22085 0
-22086 0
-22087 0

c Transitions for k = 208
c i = 1
c  -2+1 --> -1
c    ( b^{208, 1}_2 ∧  b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧  p_208) -> ( b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0)
c  in CNF:
c    -b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨  b^{208, 2}_2
c    -b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_1
c    -b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨  b^{208, 2}_0
c  in DIMACS:
-22085 -22086  22087 -208  22088 0
-22085 -22086  22087 -208 -22089 0
-22085 -22086  22087 -208  22090 0

c  -1+1 --> 0
c    ( b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧  b^{208, 1}_0 ∧  p_208) -> (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧ -b^{208, 2}_0)
c  in CNF:
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_2
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_1
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_0
c  in DIMACS:
-22085  22086 -22087 -208 -22088 0
-22085  22086 -22087 -208 -22089 0
-22085  22086 -22087 -208 -22090 0

c  0+1 --> 1
c    (-b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧  p_208) -> (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0)
c  in CNF:
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_2
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_1
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨  b^{208, 2}_0
c  in DIMACS:
 22085  22086  22087 -208 -22088 0
 22085  22086  22087 -208 -22089 0
 22085  22086  22087 -208  22090 0

c  1+1 --> 2
c    (-b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧  b^{208, 1}_0 ∧  p_208) -> (-b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0)
c  in CNF:
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_2
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨  b^{208, 2}_1
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ -p_208 ∨ -b^{208, 2}_0
c  in DIMACS:
 22085  22086 -22087 -208 -22088 0
 22085  22086 -22087 -208  22089 0
 22085  22086 -22087 -208 -22090 0

c  2+1 --> break 
c    (-b^{208, 1}_2 ∧  b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧  p_208) -> break
c  in CNF:
c     b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ -p_208 ∨ break
c  in DIMACS:
 22085 -22086  22087 -208 1162 0


c  2-1 --> 1
c    (-b^{208, 1}_2 ∧  b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧ -p_208) -> (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0)
c  in CNF:
c     b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_2
c     b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_1
c     b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨  b^{208, 2}_0
c  in DIMACS:
 22085 -22086  22087  208 -22088 0
 22085 -22086  22087  208 -22089 0
 22085 -22086  22087  208  22090 0

c  1-1 --> 0
c    (-b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧  b^{208, 1}_0 ∧ -p_208) -> (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧ -b^{208, 2}_0)
c  in CNF:
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_2
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_1
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_0
c  in DIMACS:
 22085  22086 -22087  208 -22088 0
 22085  22086 -22087  208 -22089 0
 22085  22086 -22087  208 -22090 0

c  0-1 --> -1
c    (-b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧ -p_208) -> ( b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0)
c  in CNF:
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨  b^{208, 2}_2
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_1
c     b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨  b^{208, 2}_0
c  in DIMACS:
 22085  22086  22087  208  22088 0
 22085  22086  22087  208 -22089 0
 22085  22086  22087  208  22090 0

c  -1-1 --> -2
c    ( b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧  b^{208, 1}_0 ∧ -p_208) -> ( b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0)
c  in CNF:
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨  b^{208, 2}_2
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨  b^{208, 2}_1
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨  p_208 ∨ -b^{208, 2}_0
c  in DIMACS:
-22085  22086 -22087  208  22088 0
-22085  22086 -22087  208  22089 0
-22085  22086 -22087  208 -22090 0

c  -2-1 --> break 
c    ( b^{208, 1}_2 ∧  b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧ -p_208) -> break
c  in CNF:
c    -b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨  b^{208, 1}_0 ∨  p_208 ∨ break
c  in DIMACS:
-22085 -22086  22087  208 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{208, 1}_2 ∧ -b^{208, 1}_1 ∧ -b^{208, 1}_0 ∧ true) 
c  in CNF:
c    -b^{208, 1}_2 ∨  b^{208, 1}_1 ∨  b^{208, 1}_0 ∨ false 
c  in DIMACS:
-22085  22086  22087  0

c  3 does not represent an automaton state.
c    -(-b^{208, 1}_2 ∧  b^{208, 1}_1 ∧  b^{208, 1}_0 ∧ true) 
c  in CNF:
c     b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ false 
c  in DIMACS:
 22085 -22086 -22087  0
c  -3 does not represent an automaton state.
c    -( b^{208, 1}_2 ∧  b^{208, 1}_1 ∧  b^{208, 1}_0 ∧ true) 
c  in CNF:
c    -b^{208, 1}_2 ∨ -b^{208, 1}_1 ∨ -b^{208, 1}_0 ∨ false 
c  in DIMACS:
-22085 -22086 -22087  0

c i = 2
c  -2+1 --> -1
c    ( b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧  p_416) -> ( b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0)
c  in CNF:
c    -b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨  b^{208, 3}_2
c    -b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_1
c    -b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨  b^{208, 3}_0
c  in DIMACS:
-22088 -22089  22090 -416  22091 0
-22088 -22089  22090 -416 -22092 0
-22088 -22089  22090 -416  22093 0

c  -1+1 --> 0
c    ( b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0 ∧  p_416) -> (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧ -b^{208, 3}_0)
c  in CNF:
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_2
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_1
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_0
c  in DIMACS:
-22088  22089 -22090 -416 -22091 0
-22088  22089 -22090 -416 -22092 0
-22088  22089 -22090 -416 -22093 0

c  0+1 --> 1
c    (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧  p_416) -> (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0)
c  in CNF:
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_2
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_1
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨  b^{208, 3}_0
c  in DIMACS:
 22088  22089  22090 -416 -22091 0
 22088  22089  22090 -416 -22092 0
 22088  22089  22090 -416  22093 0

c  1+1 --> 2
c    (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0 ∧  p_416) -> (-b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0)
c  in CNF:
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_2
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨  b^{208, 3}_1
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ -p_416 ∨ -b^{208, 3}_0
c  in DIMACS:
 22088  22089 -22090 -416 -22091 0
 22088  22089 -22090 -416  22092 0
 22088  22089 -22090 -416 -22093 0

c  2+1 --> break 
c    (-b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧  p_416) -> break
c  in CNF:
c     b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ -p_416 ∨ break
c  in DIMACS:
 22088 -22089  22090 -416 1162 0


c  2-1 --> 1
c    (-b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧ -p_416) -> (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0)
c  in CNF:
c     b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_2
c     b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_1
c     b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨  b^{208, 3}_0
c  in DIMACS:
 22088 -22089  22090  416 -22091 0
 22088 -22089  22090  416 -22092 0
 22088 -22089  22090  416  22093 0

c  1-1 --> 0
c    (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0 ∧ -p_416) -> (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧ -b^{208, 3}_0)
c  in CNF:
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_2
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_1
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_0
c  in DIMACS:
 22088  22089 -22090  416 -22091 0
 22088  22089 -22090  416 -22092 0
 22088  22089 -22090  416 -22093 0

c  0-1 --> -1
c    (-b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧ -p_416) -> ( b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0)
c  in CNF:
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨  b^{208, 3}_2
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_1
c     b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨  b^{208, 3}_0
c  in DIMACS:
 22088  22089  22090  416  22091 0
 22088  22089  22090  416 -22092 0
 22088  22089  22090  416  22093 0

c  -1-1 --> -2
c    ( b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧  b^{208, 2}_0 ∧ -p_416) -> ( b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0)
c  in CNF:
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨  b^{208, 3}_2
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨  b^{208, 3}_1
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨  p_416 ∨ -b^{208, 3}_0
c  in DIMACS:
-22088  22089 -22090  416  22091 0
-22088  22089 -22090  416  22092 0
-22088  22089 -22090  416 -22093 0

c  -2-1 --> break 
c    ( b^{208, 2}_2 ∧  b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧ -p_416) -> break
c  in CNF:
c    -b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨  b^{208, 2}_0 ∨  p_416 ∨ break
c  in DIMACS:
-22088 -22089  22090  416 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{208, 2}_2 ∧ -b^{208, 2}_1 ∧ -b^{208, 2}_0 ∧ true) 
c  in CNF:
c    -b^{208, 2}_2 ∨  b^{208, 2}_1 ∨  b^{208, 2}_0 ∨ false 
c  in DIMACS:
-22088  22089  22090  0

c  3 does not represent an automaton state.
c    -(-b^{208, 2}_2 ∧  b^{208, 2}_1 ∧  b^{208, 2}_0 ∧ true) 
c  in CNF:
c     b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ false 
c  in DIMACS:
 22088 -22089 -22090  0
c  -3 does not represent an automaton state.
c    -( b^{208, 2}_2 ∧  b^{208, 2}_1 ∧  b^{208, 2}_0 ∧ true) 
c  in CNF:
c    -b^{208, 2}_2 ∨ -b^{208, 2}_1 ∨ -b^{208, 2}_0 ∨ false 
c  in DIMACS:
-22088 -22089 -22090  0

c i = 3
c  -2+1 --> -1
c    ( b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧  p_624) -> ( b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0)
c  in CNF:
c    -b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨  b^{208, 4}_2
c    -b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_1
c    -b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨  b^{208, 4}_0
c  in DIMACS:
-22091 -22092  22093 -624  22094 0
-22091 -22092  22093 -624 -22095 0
-22091 -22092  22093 -624  22096 0

c  -1+1 --> 0
c    ( b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0 ∧  p_624) -> (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧ -b^{208, 4}_0)
c  in CNF:
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_2
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_1
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_0
c  in DIMACS:
-22091  22092 -22093 -624 -22094 0
-22091  22092 -22093 -624 -22095 0
-22091  22092 -22093 -624 -22096 0

c  0+1 --> 1
c    (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧  p_624) -> (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0)
c  in CNF:
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_2
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_1
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨  b^{208, 4}_0
c  in DIMACS:
 22091  22092  22093 -624 -22094 0
 22091  22092  22093 -624 -22095 0
 22091  22092  22093 -624  22096 0

c  1+1 --> 2
c    (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0 ∧  p_624) -> (-b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0)
c  in CNF:
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_2
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨  b^{208, 4}_1
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ -p_624 ∨ -b^{208, 4}_0
c  in DIMACS:
 22091  22092 -22093 -624 -22094 0
 22091  22092 -22093 -624  22095 0
 22091  22092 -22093 -624 -22096 0

c  2+1 --> break 
c    (-b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧  p_624) -> break
c  in CNF:
c     b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 22091 -22092  22093 -624 1162 0


c  2-1 --> 1
c    (-b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧ -p_624) -> (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0)
c  in CNF:
c     b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_2
c     b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_1
c     b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨  b^{208, 4}_0
c  in DIMACS:
 22091 -22092  22093  624 -22094 0
 22091 -22092  22093  624 -22095 0
 22091 -22092  22093  624  22096 0

c  1-1 --> 0
c    (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0 ∧ -p_624) -> (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧ -b^{208, 4}_0)
c  in CNF:
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_2
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_1
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_0
c  in DIMACS:
 22091  22092 -22093  624 -22094 0
 22091  22092 -22093  624 -22095 0
 22091  22092 -22093  624 -22096 0

c  0-1 --> -1
c    (-b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧ -p_624) -> ( b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0)
c  in CNF:
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨  b^{208, 4}_2
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_1
c     b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨  b^{208, 4}_0
c  in DIMACS:
 22091  22092  22093  624  22094 0
 22091  22092  22093  624 -22095 0
 22091  22092  22093  624  22096 0

c  -1-1 --> -2
c    ( b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧  b^{208, 3}_0 ∧ -p_624) -> ( b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0)
c  in CNF:
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨  b^{208, 4}_2
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨  b^{208, 4}_1
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨  p_624 ∨ -b^{208, 4}_0
c  in DIMACS:
-22091  22092 -22093  624  22094 0
-22091  22092 -22093  624  22095 0
-22091  22092 -22093  624 -22096 0

c  -2-1 --> break 
c    ( b^{208, 3}_2 ∧  b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨  b^{208, 3}_0 ∨  p_624 ∨ break
c  in DIMACS:
-22091 -22092  22093  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{208, 3}_2 ∧ -b^{208, 3}_1 ∧ -b^{208, 3}_0 ∧ true) 
c  in CNF:
c    -b^{208, 3}_2 ∨  b^{208, 3}_1 ∨  b^{208, 3}_0 ∨ false 
c  in DIMACS:
-22091  22092  22093  0

c  3 does not represent an automaton state.
c    -(-b^{208, 3}_2 ∧  b^{208, 3}_1 ∧  b^{208, 3}_0 ∧ true) 
c  in CNF:
c     b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ false 
c  in DIMACS:
 22091 -22092 -22093  0
c  -3 does not represent an automaton state.
c    -( b^{208, 3}_2 ∧  b^{208, 3}_1 ∧  b^{208, 3}_0 ∧ true) 
c  in CNF:
c    -b^{208, 3}_2 ∨ -b^{208, 3}_1 ∨ -b^{208, 3}_0 ∨ false 
c  in DIMACS:
-22091 -22092 -22093  0

c i = 4
c  -2+1 --> -1
c    ( b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧  p_832) -> ( b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0)
c  in CNF:
c    -b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨  b^{208, 5}_2
c    -b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_1
c    -b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨  b^{208, 5}_0
c  in DIMACS:
-22094 -22095  22096 -832  22097 0
-22094 -22095  22096 -832 -22098 0
-22094 -22095  22096 -832  22099 0

c  -1+1 --> 0
c    ( b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0 ∧  p_832) -> (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧ -b^{208, 5}_0)
c  in CNF:
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_2
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_1
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_0
c  in DIMACS:
-22094  22095 -22096 -832 -22097 0
-22094  22095 -22096 -832 -22098 0
-22094  22095 -22096 -832 -22099 0

c  0+1 --> 1
c    (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧  p_832) -> (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0)
c  in CNF:
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_2
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_1
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨  b^{208, 5}_0
c  in DIMACS:
 22094  22095  22096 -832 -22097 0
 22094  22095  22096 -832 -22098 0
 22094  22095  22096 -832  22099 0

c  1+1 --> 2
c    (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0 ∧  p_832) -> (-b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0)
c  in CNF:
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_2
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨  b^{208, 5}_1
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ -p_832 ∨ -b^{208, 5}_0
c  in DIMACS:
 22094  22095 -22096 -832 -22097 0
 22094  22095 -22096 -832  22098 0
 22094  22095 -22096 -832 -22099 0

c  2+1 --> break 
c    (-b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧  p_832) -> break
c  in CNF:
c     b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ -p_832 ∨ break
c  in DIMACS:
 22094 -22095  22096 -832 1162 0


c  2-1 --> 1
c    (-b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧ -p_832) -> (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0)
c  in CNF:
c     b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_2
c     b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_1
c     b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨  b^{208, 5}_0
c  in DIMACS:
 22094 -22095  22096  832 -22097 0
 22094 -22095  22096  832 -22098 0
 22094 -22095  22096  832  22099 0

c  1-1 --> 0
c    (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0 ∧ -p_832) -> (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧ -b^{208, 5}_0)
c  in CNF:
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_2
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_1
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_0
c  in DIMACS:
 22094  22095 -22096  832 -22097 0
 22094  22095 -22096  832 -22098 0
 22094  22095 -22096  832 -22099 0

c  0-1 --> -1
c    (-b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧ -p_832) -> ( b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0)
c  in CNF:
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨  b^{208, 5}_2
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_1
c     b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨  b^{208, 5}_0
c  in DIMACS:
 22094  22095  22096  832  22097 0
 22094  22095  22096  832 -22098 0
 22094  22095  22096  832  22099 0

c  -1-1 --> -2
c    ( b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧  b^{208, 4}_0 ∧ -p_832) -> ( b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0)
c  in CNF:
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨  b^{208, 5}_2
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨  b^{208, 5}_1
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨  p_832 ∨ -b^{208, 5}_0
c  in DIMACS:
-22094  22095 -22096  832  22097 0
-22094  22095 -22096  832  22098 0
-22094  22095 -22096  832 -22099 0

c  -2-1 --> break 
c    ( b^{208, 4}_2 ∧  b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧ -p_832) -> break
c  in CNF:
c    -b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨  b^{208, 4}_0 ∨  p_832 ∨ break
c  in DIMACS:
-22094 -22095  22096  832 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{208, 4}_2 ∧ -b^{208, 4}_1 ∧ -b^{208, 4}_0 ∧ true) 
c  in CNF:
c    -b^{208, 4}_2 ∨  b^{208, 4}_1 ∨  b^{208, 4}_0 ∨ false 
c  in DIMACS:
-22094  22095  22096  0

c  3 does not represent an automaton state.
c    -(-b^{208, 4}_2 ∧  b^{208, 4}_1 ∧  b^{208, 4}_0 ∧ true) 
c  in CNF:
c     b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ false 
c  in DIMACS:
 22094 -22095 -22096  0
c  -3 does not represent an automaton state.
c    -( b^{208, 4}_2 ∧  b^{208, 4}_1 ∧  b^{208, 4}_0 ∧ true) 
c  in CNF:
c    -b^{208, 4}_2 ∨ -b^{208, 4}_1 ∨ -b^{208, 4}_0 ∨ false 
c  in DIMACS:
-22094 -22095 -22096  0

c i = 5
c  -2+1 --> -1
c    ( b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧  p_1040) -> ( b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧  b^{208, 6}_0)
c  in CNF:
c    -b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨  b^{208, 6}_2
c    -b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_1
c    -b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨  b^{208, 6}_0
c  in DIMACS:
-22097 -22098  22099 -1040  22100 0
-22097 -22098  22099 -1040 -22101 0
-22097 -22098  22099 -1040  22102 0

c  -1+1 --> 0
c    ( b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0 ∧  p_1040) -> (-b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧ -b^{208, 6}_0)
c  in CNF:
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_2
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_1
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_0
c  in DIMACS:
-22097  22098 -22099 -1040 -22100 0
-22097  22098 -22099 -1040 -22101 0
-22097  22098 -22099 -1040 -22102 0

c  0+1 --> 1
c    (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧  p_1040) -> (-b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧  b^{208, 6}_0)
c  in CNF:
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_2
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_1
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨  b^{208, 6}_0
c  in DIMACS:
 22097  22098  22099 -1040 -22100 0
 22097  22098  22099 -1040 -22101 0
 22097  22098  22099 -1040  22102 0

c  1+1 --> 2
c    (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0 ∧  p_1040) -> (-b^{208, 6}_2 ∧  b^{208, 6}_1 ∧ -b^{208, 6}_0)
c  in CNF:
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_2
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨  b^{208, 6}_1
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ -p_1040 ∨ -b^{208, 6}_0
c  in DIMACS:
 22097  22098 -22099 -1040 -22100 0
 22097  22098 -22099 -1040  22101 0
 22097  22098 -22099 -1040 -22102 0

c  2+1 --> break 
c    (-b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 22097 -22098  22099 -1040 1162 0


c  2-1 --> 1
c    (-b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧ -p_1040) -> (-b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧  b^{208, 6}_0)
c  in CNF:
c     b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_2
c     b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_1
c     b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨  b^{208, 6}_0
c  in DIMACS:
 22097 -22098  22099  1040 -22100 0
 22097 -22098  22099  1040 -22101 0
 22097 -22098  22099  1040  22102 0

c  1-1 --> 0
c    (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0 ∧ -p_1040) -> (-b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧ -b^{208, 6}_0)
c  in CNF:
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_2
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_1
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_0
c  in DIMACS:
 22097  22098 -22099  1040 -22100 0
 22097  22098 -22099  1040 -22101 0
 22097  22098 -22099  1040 -22102 0

c  0-1 --> -1
c    (-b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧ -p_1040) -> ( b^{208, 6}_2 ∧ -b^{208, 6}_1 ∧  b^{208, 6}_0)
c  in CNF:
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨  b^{208, 6}_2
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_1
c     b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨  b^{208, 6}_0
c  in DIMACS:
 22097  22098  22099  1040  22100 0
 22097  22098  22099  1040 -22101 0
 22097  22098  22099  1040  22102 0

c  -1-1 --> -2
c    ( b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧  b^{208, 5}_0 ∧ -p_1040) -> ( b^{208, 6}_2 ∧  b^{208, 6}_1 ∧ -b^{208, 6}_0)
c  in CNF:
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨  b^{208, 6}_2
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨  b^{208, 6}_1
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨  p_1040 ∨ -b^{208, 6}_0
c  in DIMACS:
-22097  22098 -22099  1040  22100 0
-22097  22098 -22099  1040  22101 0
-22097  22098 -22099  1040 -22102 0

c  -2-1 --> break 
c    ( b^{208, 5}_2 ∧  b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨  b^{208, 5}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-22097 -22098  22099  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{208, 5}_2 ∧ -b^{208, 5}_1 ∧ -b^{208, 5}_0 ∧ true) 
c  in CNF:
c    -b^{208, 5}_2 ∨  b^{208, 5}_1 ∨  b^{208, 5}_0 ∨ false 
c  in DIMACS:
-22097  22098  22099  0

c  3 does not represent an automaton state.
c    -(-b^{208, 5}_2 ∧  b^{208, 5}_1 ∧  b^{208, 5}_0 ∧ true) 
c  in CNF:
c     b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ false 
c  in DIMACS:
 22097 -22098 -22099  0
c  -3 does not represent an automaton state.
c    -( b^{208, 5}_2 ∧  b^{208, 5}_1 ∧  b^{208, 5}_0 ∧ true) 
c  in CNF:
c    -b^{208, 5}_2 ∨ -b^{208, 5}_1 ∨ -b^{208, 5}_0 ∨ false 
c  in DIMACS:
-22097 -22098 -22099  0

c INIT for k = 209
c    -b^{209, 1}_2
c    -b^{209, 1}_1
c    -b^{209, 1}_0
c  in DIMACS:
-22103 0
-22104 0
-22105 0

c Transitions for k = 209
c i = 1
c  -2+1 --> -1
c    ( b^{209, 1}_2 ∧  b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧  p_209) -> ( b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0)
c  in CNF:
c    -b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨  b^{209, 2}_2
c    -b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_1
c    -b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨  b^{209, 2}_0
c  in DIMACS:
-22103 -22104  22105 -209  22106 0
-22103 -22104  22105 -209 -22107 0
-22103 -22104  22105 -209  22108 0

c  -1+1 --> 0
c    ( b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧  b^{209, 1}_0 ∧  p_209) -> (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧ -b^{209, 2}_0)
c  in CNF:
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_2
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_1
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_0
c  in DIMACS:
-22103  22104 -22105 -209 -22106 0
-22103  22104 -22105 -209 -22107 0
-22103  22104 -22105 -209 -22108 0

c  0+1 --> 1
c    (-b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧  p_209) -> (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0)
c  in CNF:
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_2
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_1
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨  b^{209, 2}_0
c  in DIMACS:
 22103  22104  22105 -209 -22106 0
 22103  22104  22105 -209 -22107 0
 22103  22104  22105 -209  22108 0

c  1+1 --> 2
c    (-b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧  b^{209, 1}_0 ∧  p_209) -> (-b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0)
c  in CNF:
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_2
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨  b^{209, 2}_1
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ -p_209 ∨ -b^{209, 2}_0
c  in DIMACS:
 22103  22104 -22105 -209 -22106 0
 22103  22104 -22105 -209  22107 0
 22103  22104 -22105 -209 -22108 0

c  2+1 --> break 
c    (-b^{209, 1}_2 ∧  b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧  p_209) -> break
c  in CNF:
c     b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ -p_209 ∨ break
c  in DIMACS:
 22103 -22104  22105 -209 1162 0


c  2-1 --> 1
c    (-b^{209, 1}_2 ∧  b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧ -p_209) -> (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0)
c  in CNF:
c     b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_2
c     b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_1
c     b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨  b^{209, 2}_0
c  in DIMACS:
 22103 -22104  22105  209 -22106 0
 22103 -22104  22105  209 -22107 0
 22103 -22104  22105  209  22108 0

c  1-1 --> 0
c    (-b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧  b^{209, 1}_0 ∧ -p_209) -> (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧ -b^{209, 2}_0)
c  in CNF:
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_2
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_1
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_0
c  in DIMACS:
 22103  22104 -22105  209 -22106 0
 22103  22104 -22105  209 -22107 0
 22103  22104 -22105  209 -22108 0

c  0-1 --> -1
c    (-b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧ -p_209) -> ( b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0)
c  in CNF:
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨  b^{209, 2}_2
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_1
c     b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨  b^{209, 2}_0
c  in DIMACS:
 22103  22104  22105  209  22106 0
 22103  22104  22105  209 -22107 0
 22103  22104  22105  209  22108 0

c  -1-1 --> -2
c    ( b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧  b^{209, 1}_0 ∧ -p_209) -> ( b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0)
c  in CNF:
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨  b^{209, 2}_2
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨  b^{209, 2}_1
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨  p_209 ∨ -b^{209, 2}_0
c  in DIMACS:
-22103  22104 -22105  209  22106 0
-22103  22104 -22105  209  22107 0
-22103  22104 -22105  209 -22108 0

c  -2-1 --> break 
c    ( b^{209, 1}_2 ∧  b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧ -p_209) -> break
c  in CNF:
c    -b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨  b^{209, 1}_0 ∨  p_209 ∨ break
c  in DIMACS:
-22103 -22104  22105  209 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{209, 1}_2 ∧ -b^{209, 1}_1 ∧ -b^{209, 1}_0 ∧ true) 
c  in CNF:
c    -b^{209, 1}_2 ∨  b^{209, 1}_1 ∨  b^{209, 1}_0 ∨ false 
c  in DIMACS:
-22103  22104  22105  0

c  3 does not represent an automaton state.
c    -(-b^{209, 1}_2 ∧  b^{209, 1}_1 ∧  b^{209, 1}_0 ∧ true) 
c  in CNF:
c     b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ false 
c  in DIMACS:
 22103 -22104 -22105  0
c  -3 does not represent an automaton state.
c    -( b^{209, 1}_2 ∧  b^{209, 1}_1 ∧  b^{209, 1}_0 ∧ true) 
c  in CNF:
c    -b^{209, 1}_2 ∨ -b^{209, 1}_1 ∨ -b^{209, 1}_0 ∨ false 
c  in DIMACS:
-22103 -22104 -22105  0

c i = 2
c  -2+1 --> -1
c    ( b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧  p_418) -> ( b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0)
c  in CNF:
c    -b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨  b^{209, 3}_2
c    -b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_1
c    -b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨  b^{209, 3}_0
c  in DIMACS:
-22106 -22107  22108 -418  22109 0
-22106 -22107  22108 -418 -22110 0
-22106 -22107  22108 -418  22111 0

c  -1+1 --> 0
c    ( b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0 ∧  p_418) -> (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧ -b^{209, 3}_0)
c  in CNF:
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_2
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_1
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_0
c  in DIMACS:
-22106  22107 -22108 -418 -22109 0
-22106  22107 -22108 -418 -22110 0
-22106  22107 -22108 -418 -22111 0

c  0+1 --> 1
c    (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧  p_418) -> (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0)
c  in CNF:
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_2
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_1
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨  b^{209, 3}_0
c  in DIMACS:
 22106  22107  22108 -418 -22109 0
 22106  22107  22108 -418 -22110 0
 22106  22107  22108 -418  22111 0

c  1+1 --> 2
c    (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0 ∧  p_418) -> (-b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0)
c  in CNF:
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_2
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨  b^{209, 3}_1
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ -p_418 ∨ -b^{209, 3}_0
c  in DIMACS:
 22106  22107 -22108 -418 -22109 0
 22106  22107 -22108 -418  22110 0
 22106  22107 -22108 -418 -22111 0

c  2+1 --> break 
c    (-b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧  p_418) -> break
c  in CNF:
c     b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ -p_418 ∨ break
c  in DIMACS:
 22106 -22107  22108 -418 1162 0


c  2-1 --> 1
c    (-b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧ -p_418) -> (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0)
c  in CNF:
c     b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_2
c     b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_1
c     b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨  b^{209, 3}_0
c  in DIMACS:
 22106 -22107  22108  418 -22109 0
 22106 -22107  22108  418 -22110 0
 22106 -22107  22108  418  22111 0

c  1-1 --> 0
c    (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0 ∧ -p_418) -> (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧ -b^{209, 3}_0)
c  in CNF:
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_2
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_1
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_0
c  in DIMACS:
 22106  22107 -22108  418 -22109 0
 22106  22107 -22108  418 -22110 0
 22106  22107 -22108  418 -22111 0

c  0-1 --> -1
c    (-b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧ -p_418) -> ( b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0)
c  in CNF:
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨  b^{209, 3}_2
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_1
c     b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨  b^{209, 3}_0
c  in DIMACS:
 22106  22107  22108  418  22109 0
 22106  22107  22108  418 -22110 0
 22106  22107  22108  418  22111 0

c  -1-1 --> -2
c    ( b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧  b^{209, 2}_0 ∧ -p_418) -> ( b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0)
c  in CNF:
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨  b^{209, 3}_2
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨  b^{209, 3}_1
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨  p_418 ∨ -b^{209, 3}_0
c  in DIMACS:
-22106  22107 -22108  418  22109 0
-22106  22107 -22108  418  22110 0
-22106  22107 -22108  418 -22111 0

c  -2-1 --> break 
c    ( b^{209, 2}_2 ∧  b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧ -p_418) -> break
c  in CNF:
c    -b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨  b^{209, 2}_0 ∨  p_418 ∨ break
c  in DIMACS:
-22106 -22107  22108  418 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{209, 2}_2 ∧ -b^{209, 2}_1 ∧ -b^{209, 2}_0 ∧ true) 
c  in CNF:
c    -b^{209, 2}_2 ∨  b^{209, 2}_1 ∨  b^{209, 2}_0 ∨ false 
c  in DIMACS:
-22106  22107  22108  0

c  3 does not represent an automaton state.
c    -(-b^{209, 2}_2 ∧  b^{209, 2}_1 ∧  b^{209, 2}_0 ∧ true) 
c  in CNF:
c     b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ false 
c  in DIMACS:
 22106 -22107 -22108  0
c  -3 does not represent an automaton state.
c    -( b^{209, 2}_2 ∧  b^{209, 2}_1 ∧  b^{209, 2}_0 ∧ true) 
c  in CNF:
c    -b^{209, 2}_2 ∨ -b^{209, 2}_1 ∨ -b^{209, 2}_0 ∨ false 
c  in DIMACS:
-22106 -22107 -22108  0

c i = 3
c  -2+1 --> -1
c    ( b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧  p_627) -> ( b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0)
c  in CNF:
c    -b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨  b^{209, 4}_2
c    -b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_1
c    -b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨  b^{209, 4}_0
c  in DIMACS:
-22109 -22110  22111 -627  22112 0
-22109 -22110  22111 -627 -22113 0
-22109 -22110  22111 -627  22114 0

c  -1+1 --> 0
c    ( b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0 ∧  p_627) -> (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧ -b^{209, 4}_0)
c  in CNF:
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_2
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_1
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_0
c  in DIMACS:
-22109  22110 -22111 -627 -22112 0
-22109  22110 -22111 -627 -22113 0
-22109  22110 -22111 -627 -22114 0

c  0+1 --> 1
c    (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧  p_627) -> (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0)
c  in CNF:
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_2
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_1
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨  b^{209, 4}_0
c  in DIMACS:
 22109  22110  22111 -627 -22112 0
 22109  22110  22111 -627 -22113 0
 22109  22110  22111 -627  22114 0

c  1+1 --> 2
c    (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0 ∧  p_627) -> (-b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0)
c  in CNF:
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_2
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨  b^{209, 4}_1
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ -p_627 ∨ -b^{209, 4}_0
c  in DIMACS:
 22109  22110 -22111 -627 -22112 0
 22109  22110 -22111 -627  22113 0
 22109  22110 -22111 -627 -22114 0

c  2+1 --> break 
c    (-b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧  p_627) -> break
c  in CNF:
c     b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ -p_627 ∨ break
c  in DIMACS:
 22109 -22110  22111 -627 1162 0


c  2-1 --> 1
c    (-b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧ -p_627) -> (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0)
c  in CNF:
c     b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_2
c     b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_1
c     b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨  b^{209, 4}_0
c  in DIMACS:
 22109 -22110  22111  627 -22112 0
 22109 -22110  22111  627 -22113 0
 22109 -22110  22111  627  22114 0

c  1-1 --> 0
c    (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0 ∧ -p_627) -> (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧ -b^{209, 4}_0)
c  in CNF:
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_2
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_1
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_0
c  in DIMACS:
 22109  22110 -22111  627 -22112 0
 22109  22110 -22111  627 -22113 0
 22109  22110 -22111  627 -22114 0

c  0-1 --> -1
c    (-b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧ -p_627) -> ( b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0)
c  in CNF:
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨  b^{209, 4}_2
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_1
c     b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨  b^{209, 4}_0
c  in DIMACS:
 22109  22110  22111  627  22112 0
 22109  22110  22111  627 -22113 0
 22109  22110  22111  627  22114 0

c  -1-1 --> -2
c    ( b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧  b^{209, 3}_0 ∧ -p_627) -> ( b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0)
c  in CNF:
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨  b^{209, 4}_2
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨  b^{209, 4}_1
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨  p_627 ∨ -b^{209, 4}_0
c  in DIMACS:
-22109  22110 -22111  627  22112 0
-22109  22110 -22111  627  22113 0
-22109  22110 -22111  627 -22114 0

c  -2-1 --> break 
c    ( b^{209, 3}_2 ∧  b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧ -p_627) -> break
c  in CNF:
c    -b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨  b^{209, 3}_0 ∨  p_627 ∨ break
c  in DIMACS:
-22109 -22110  22111  627 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{209, 3}_2 ∧ -b^{209, 3}_1 ∧ -b^{209, 3}_0 ∧ true) 
c  in CNF:
c    -b^{209, 3}_2 ∨  b^{209, 3}_1 ∨  b^{209, 3}_0 ∨ false 
c  in DIMACS:
-22109  22110  22111  0

c  3 does not represent an automaton state.
c    -(-b^{209, 3}_2 ∧  b^{209, 3}_1 ∧  b^{209, 3}_0 ∧ true) 
c  in CNF:
c     b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ false 
c  in DIMACS:
 22109 -22110 -22111  0
c  -3 does not represent an automaton state.
c    -( b^{209, 3}_2 ∧  b^{209, 3}_1 ∧  b^{209, 3}_0 ∧ true) 
c  in CNF:
c    -b^{209, 3}_2 ∨ -b^{209, 3}_1 ∨ -b^{209, 3}_0 ∨ false 
c  in DIMACS:
-22109 -22110 -22111  0

c i = 4
c  -2+1 --> -1
c    ( b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧  p_836) -> ( b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0)
c  in CNF:
c    -b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨  b^{209, 5}_2
c    -b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_1
c    -b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨  b^{209, 5}_0
c  in DIMACS:
-22112 -22113  22114 -836  22115 0
-22112 -22113  22114 -836 -22116 0
-22112 -22113  22114 -836  22117 0

c  -1+1 --> 0
c    ( b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0 ∧  p_836) -> (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧ -b^{209, 5}_0)
c  in CNF:
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_2
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_1
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_0
c  in DIMACS:
-22112  22113 -22114 -836 -22115 0
-22112  22113 -22114 -836 -22116 0
-22112  22113 -22114 -836 -22117 0

c  0+1 --> 1
c    (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧  p_836) -> (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0)
c  in CNF:
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_2
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_1
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨  b^{209, 5}_0
c  in DIMACS:
 22112  22113  22114 -836 -22115 0
 22112  22113  22114 -836 -22116 0
 22112  22113  22114 -836  22117 0

c  1+1 --> 2
c    (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0 ∧  p_836) -> (-b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0)
c  in CNF:
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_2
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨  b^{209, 5}_1
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ -p_836 ∨ -b^{209, 5}_0
c  in DIMACS:
 22112  22113 -22114 -836 -22115 0
 22112  22113 -22114 -836  22116 0
 22112  22113 -22114 -836 -22117 0

c  2+1 --> break 
c    (-b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧  p_836) -> break
c  in CNF:
c     b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ -p_836 ∨ break
c  in DIMACS:
 22112 -22113  22114 -836 1162 0


c  2-1 --> 1
c    (-b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧ -p_836) -> (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0)
c  in CNF:
c     b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_2
c     b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_1
c     b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨  b^{209, 5}_0
c  in DIMACS:
 22112 -22113  22114  836 -22115 0
 22112 -22113  22114  836 -22116 0
 22112 -22113  22114  836  22117 0

c  1-1 --> 0
c    (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0 ∧ -p_836) -> (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧ -b^{209, 5}_0)
c  in CNF:
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_2
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_1
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_0
c  in DIMACS:
 22112  22113 -22114  836 -22115 0
 22112  22113 -22114  836 -22116 0
 22112  22113 -22114  836 -22117 0

c  0-1 --> -1
c    (-b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧ -p_836) -> ( b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0)
c  in CNF:
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨  b^{209, 5}_2
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_1
c     b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨  b^{209, 5}_0
c  in DIMACS:
 22112  22113  22114  836  22115 0
 22112  22113  22114  836 -22116 0
 22112  22113  22114  836  22117 0

c  -1-1 --> -2
c    ( b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧  b^{209, 4}_0 ∧ -p_836) -> ( b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0)
c  in CNF:
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨  b^{209, 5}_2
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨  b^{209, 5}_1
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨  p_836 ∨ -b^{209, 5}_0
c  in DIMACS:
-22112  22113 -22114  836  22115 0
-22112  22113 -22114  836  22116 0
-22112  22113 -22114  836 -22117 0

c  -2-1 --> break 
c    ( b^{209, 4}_2 ∧  b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧ -p_836) -> break
c  in CNF:
c    -b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨  b^{209, 4}_0 ∨  p_836 ∨ break
c  in DIMACS:
-22112 -22113  22114  836 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{209, 4}_2 ∧ -b^{209, 4}_1 ∧ -b^{209, 4}_0 ∧ true) 
c  in CNF:
c    -b^{209, 4}_2 ∨  b^{209, 4}_1 ∨  b^{209, 4}_0 ∨ false 
c  in DIMACS:
-22112  22113  22114  0

c  3 does not represent an automaton state.
c    -(-b^{209, 4}_2 ∧  b^{209, 4}_1 ∧  b^{209, 4}_0 ∧ true) 
c  in CNF:
c     b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ false 
c  in DIMACS:
 22112 -22113 -22114  0
c  -3 does not represent an automaton state.
c    -( b^{209, 4}_2 ∧  b^{209, 4}_1 ∧  b^{209, 4}_0 ∧ true) 
c  in CNF:
c    -b^{209, 4}_2 ∨ -b^{209, 4}_1 ∨ -b^{209, 4}_0 ∨ false 
c  in DIMACS:
-22112 -22113 -22114  0

c i = 5
c  -2+1 --> -1
c    ( b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧  p_1045) -> ( b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧  b^{209, 6}_0)
c  in CNF:
c    -b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨  b^{209, 6}_2
c    -b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_1
c    -b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨  b^{209, 6}_0
c  in DIMACS:
-22115 -22116  22117 -1045  22118 0
-22115 -22116  22117 -1045 -22119 0
-22115 -22116  22117 -1045  22120 0

c  -1+1 --> 0
c    ( b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0 ∧  p_1045) -> (-b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧ -b^{209, 6}_0)
c  in CNF:
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_2
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_1
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_0
c  in DIMACS:
-22115  22116 -22117 -1045 -22118 0
-22115  22116 -22117 -1045 -22119 0
-22115  22116 -22117 -1045 -22120 0

c  0+1 --> 1
c    (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧  p_1045) -> (-b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧  b^{209, 6}_0)
c  in CNF:
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_2
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_1
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨  b^{209, 6}_0
c  in DIMACS:
 22115  22116  22117 -1045 -22118 0
 22115  22116  22117 -1045 -22119 0
 22115  22116  22117 -1045  22120 0

c  1+1 --> 2
c    (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0 ∧  p_1045) -> (-b^{209, 6}_2 ∧  b^{209, 6}_1 ∧ -b^{209, 6}_0)
c  in CNF:
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_2
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨  b^{209, 6}_1
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ -p_1045 ∨ -b^{209, 6}_0
c  in DIMACS:
 22115  22116 -22117 -1045 -22118 0
 22115  22116 -22117 -1045  22119 0
 22115  22116 -22117 -1045 -22120 0

c  2+1 --> break 
c    (-b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧  p_1045) -> break
c  in CNF:
c     b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ -p_1045 ∨ break
c  in DIMACS:
 22115 -22116  22117 -1045 1162 0


c  2-1 --> 1
c    (-b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧ -p_1045) -> (-b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧  b^{209, 6}_0)
c  in CNF:
c     b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_2
c     b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_1
c     b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨  b^{209, 6}_0
c  in DIMACS:
 22115 -22116  22117  1045 -22118 0
 22115 -22116  22117  1045 -22119 0
 22115 -22116  22117  1045  22120 0

c  1-1 --> 0
c    (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0 ∧ -p_1045) -> (-b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧ -b^{209, 6}_0)
c  in CNF:
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_2
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_1
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_0
c  in DIMACS:
 22115  22116 -22117  1045 -22118 0
 22115  22116 -22117  1045 -22119 0
 22115  22116 -22117  1045 -22120 0

c  0-1 --> -1
c    (-b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧ -p_1045) -> ( b^{209, 6}_2 ∧ -b^{209, 6}_1 ∧  b^{209, 6}_0)
c  in CNF:
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨  b^{209, 6}_2
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_1
c     b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨  b^{209, 6}_0
c  in DIMACS:
 22115  22116  22117  1045  22118 0
 22115  22116  22117  1045 -22119 0
 22115  22116  22117  1045  22120 0

c  -1-1 --> -2
c    ( b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧  b^{209, 5}_0 ∧ -p_1045) -> ( b^{209, 6}_2 ∧  b^{209, 6}_1 ∧ -b^{209, 6}_0)
c  in CNF:
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨  b^{209, 6}_2
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨  b^{209, 6}_1
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨  p_1045 ∨ -b^{209, 6}_0
c  in DIMACS:
-22115  22116 -22117  1045  22118 0
-22115  22116 -22117  1045  22119 0
-22115  22116 -22117  1045 -22120 0

c  -2-1 --> break 
c    ( b^{209, 5}_2 ∧  b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧ -p_1045) -> break
c  in CNF:
c    -b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨  b^{209, 5}_0 ∨  p_1045 ∨ break
c  in DIMACS:
-22115 -22116  22117  1045 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{209, 5}_2 ∧ -b^{209, 5}_1 ∧ -b^{209, 5}_0 ∧ true) 
c  in CNF:
c    -b^{209, 5}_2 ∨  b^{209, 5}_1 ∨  b^{209, 5}_0 ∨ false 
c  in DIMACS:
-22115  22116  22117  0

c  3 does not represent an automaton state.
c    -(-b^{209, 5}_2 ∧  b^{209, 5}_1 ∧  b^{209, 5}_0 ∧ true) 
c  in CNF:
c     b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ false 
c  in DIMACS:
 22115 -22116 -22117  0
c  -3 does not represent an automaton state.
c    -( b^{209, 5}_2 ∧  b^{209, 5}_1 ∧  b^{209, 5}_0 ∧ true) 
c  in CNF:
c    -b^{209, 5}_2 ∨ -b^{209, 5}_1 ∨ -b^{209, 5}_0 ∨ false 
c  in DIMACS:
-22115 -22116 -22117  0

c INIT for k = 210
c    -b^{210, 1}_2
c    -b^{210, 1}_1
c    -b^{210, 1}_0
c  in DIMACS:
-22121 0
-22122 0
-22123 0

c Transitions for k = 210
c i = 1
c  -2+1 --> -1
c    ( b^{210, 1}_2 ∧  b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧  p_210) -> ( b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0)
c  in CNF:
c    -b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨  b^{210, 2}_2
c    -b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_1
c    -b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨  b^{210, 2}_0
c  in DIMACS:
-22121 -22122  22123 -210  22124 0
-22121 -22122  22123 -210 -22125 0
-22121 -22122  22123 -210  22126 0

c  -1+1 --> 0
c    ( b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧  b^{210, 1}_0 ∧  p_210) -> (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧ -b^{210, 2}_0)
c  in CNF:
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_2
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_1
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_0
c  in DIMACS:
-22121  22122 -22123 -210 -22124 0
-22121  22122 -22123 -210 -22125 0
-22121  22122 -22123 -210 -22126 0

c  0+1 --> 1
c    (-b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧  p_210) -> (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0)
c  in CNF:
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_2
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_1
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨  b^{210, 2}_0
c  in DIMACS:
 22121  22122  22123 -210 -22124 0
 22121  22122  22123 -210 -22125 0
 22121  22122  22123 -210  22126 0

c  1+1 --> 2
c    (-b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧  b^{210, 1}_0 ∧  p_210) -> (-b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0)
c  in CNF:
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_2
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨  b^{210, 2}_1
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ -p_210 ∨ -b^{210, 2}_0
c  in DIMACS:
 22121  22122 -22123 -210 -22124 0
 22121  22122 -22123 -210  22125 0
 22121  22122 -22123 -210 -22126 0

c  2+1 --> break 
c    (-b^{210, 1}_2 ∧  b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧  p_210) -> break
c  in CNF:
c     b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ -p_210 ∨ break
c  in DIMACS:
 22121 -22122  22123 -210 1162 0


c  2-1 --> 1
c    (-b^{210, 1}_2 ∧  b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧ -p_210) -> (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0)
c  in CNF:
c     b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_2
c     b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_1
c     b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨  b^{210, 2}_0
c  in DIMACS:
 22121 -22122  22123  210 -22124 0
 22121 -22122  22123  210 -22125 0
 22121 -22122  22123  210  22126 0

c  1-1 --> 0
c    (-b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧  b^{210, 1}_0 ∧ -p_210) -> (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧ -b^{210, 2}_0)
c  in CNF:
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_2
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_1
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_0
c  in DIMACS:
 22121  22122 -22123  210 -22124 0
 22121  22122 -22123  210 -22125 0
 22121  22122 -22123  210 -22126 0

c  0-1 --> -1
c    (-b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧ -p_210) -> ( b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0)
c  in CNF:
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨  b^{210, 2}_2
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_1
c     b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨  b^{210, 2}_0
c  in DIMACS:
 22121  22122  22123  210  22124 0
 22121  22122  22123  210 -22125 0
 22121  22122  22123  210  22126 0

c  -1-1 --> -2
c    ( b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧  b^{210, 1}_0 ∧ -p_210) -> ( b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0)
c  in CNF:
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨  b^{210, 2}_2
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨  b^{210, 2}_1
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨  p_210 ∨ -b^{210, 2}_0
c  in DIMACS:
-22121  22122 -22123  210  22124 0
-22121  22122 -22123  210  22125 0
-22121  22122 -22123  210 -22126 0

c  -2-1 --> break 
c    ( b^{210, 1}_2 ∧  b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧ -p_210) -> break
c  in CNF:
c    -b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨  b^{210, 1}_0 ∨  p_210 ∨ break
c  in DIMACS:
-22121 -22122  22123  210 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{210, 1}_2 ∧ -b^{210, 1}_1 ∧ -b^{210, 1}_0 ∧ true) 
c  in CNF:
c    -b^{210, 1}_2 ∨  b^{210, 1}_1 ∨  b^{210, 1}_0 ∨ false 
c  in DIMACS:
-22121  22122  22123  0

c  3 does not represent an automaton state.
c    -(-b^{210, 1}_2 ∧  b^{210, 1}_1 ∧  b^{210, 1}_0 ∧ true) 
c  in CNF:
c     b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ false 
c  in DIMACS:
 22121 -22122 -22123  0
c  -3 does not represent an automaton state.
c    -( b^{210, 1}_2 ∧  b^{210, 1}_1 ∧  b^{210, 1}_0 ∧ true) 
c  in CNF:
c    -b^{210, 1}_2 ∨ -b^{210, 1}_1 ∨ -b^{210, 1}_0 ∨ false 
c  in DIMACS:
-22121 -22122 -22123  0

c i = 2
c  -2+1 --> -1
c    ( b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧  p_420) -> ( b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0)
c  in CNF:
c    -b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨  b^{210, 3}_2
c    -b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_1
c    -b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨  b^{210, 3}_0
c  in DIMACS:
-22124 -22125  22126 -420  22127 0
-22124 -22125  22126 -420 -22128 0
-22124 -22125  22126 -420  22129 0

c  -1+1 --> 0
c    ( b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0 ∧  p_420) -> (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧ -b^{210, 3}_0)
c  in CNF:
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_2
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_1
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_0
c  in DIMACS:
-22124  22125 -22126 -420 -22127 0
-22124  22125 -22126 -420 -22128 0
-22124  22125 -22126 -420 -22129 0

c  0+1 --> 1
c    (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧  p_420) -> (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0)
c  in CNF:
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_2
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_1
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨  b^{210, 3}_0
c  in DIMACS:
 22124  22125  22126 -420 -22127 0
 22124  22125  22126 -420 -22128 0
 22124  22125  22126 -420  22129 0

c  1+1 --> 2
c    (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0 ∧  p_420) -> (-b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0)
c  in CNF:
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_2
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨  b^{210, 3}_1
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ -p_420 ∨ -b^{210, 3}_0
c  in DIMACS:
 22124  22125 -22126 -420 -22127 0
 22124  22125 -22126 -420  22128 0
 22124  22125 -22126 -420 -22129 0

c  2+1 --> break 
c    (-b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧  p_420) -> break
c  in CNF:
c     b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ -p_420 ∨ break
c  in DIMACS:
 22124 -22125  22126 -420 1162 0


c  2-1 --> 1
c    (-b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧ -p_420) -> (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0)
c  in CNF:
c     b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_2
c     b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_1
c     b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨  b^{210, 3}_0
c  in DIMACS:
 22124 -22125  22126  420 -22127 0
 22124 -22125  22126  420 -22128 0
 22124 -22125  22126  420  22129 0

c  1-1 --> 0
c    (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0 ∧ -p_420) -> (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧ -b^{210, 3}_0)
c  in CNF:
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_2
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_1
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_0
c  in DIMACS:
 22124  22125 -22126  420 -22127 0
 22124  22125 -22126  420 -22128 0
 22124  22125 -22126  420 -22129 0

c  0-1 --> -1
c    (-b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧ -p_420) -> ( b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0)
c  in CNF:
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨  b^{210, 3}_2
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_1
c     b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨  b^{210, 3}_0
c  in DIMACS:
 22124  22125  22126  420  22127 0
 22124  22125  22126  420 -22128 0
 22124  22125  22126  420  22129 0

c  -1-1 --> -2
c    ( b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧  b^{210, 2}_0 ∧ -p_420) -> ( b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0)
c  in CNF:
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨  b^{210, 3}_2
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨  b^{210, 3}_1
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨  p_420 ∨ -b^{210, 3}_0
c  in DIMACS:
-22124  22125 -22126  420  22127 0
-22124  22125 -22126  420  22128 0
-22124  22125 -22126  420 -22129 0

c  -2-1 --> break 
c    ( b^{210, 2}_2 ∧  b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧ -p_420) -> break
c  in CNF:
c    -b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨  b^{210, 2}_0 ∨  p_420 ∨ break
c  in DIMACS:
-22124 -22125  22126  420 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{210, 2}_2 ∧ -b^{210, 2}_1 ∧ -b^{210, 2}_0 ∧ true) 
c  in CNF:
c    -b^{210, 2}_2 ∨  b^{210, 2}_1 ∨  b^{210, 2}_0 ∨ false 
c  in DIMACS:
-22124  22125  22126  0

c  3 does not represent an automaton state.
c    -(-b^{210, 2}_2 ∧  b^{210, 2}_1 ∧  b^{210, 2}_0 ∧ true) 
c  in CNF:
c     b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ false 
c  in DIMACS:
 22124 -22125 -22126  0
c  -3 does not represent an automaton state.
c    -( b^{210, 2}_2 ∧  b^{210, 2}_1 ∧  b^{210, 2}_0 ∧ true) 
c  in CNF:
c    -b^{210, 2}_2 ∨ -b^{210, 2}_1 ∨ -b^{210, 2}_0 ∨ false 
c  in DIMACS:
-22124 -22125 -22126  0

c i = 3
c  -2+1 --> -1
c    ( b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧  p_630) -> ( b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0)
c  in CNF:
c    -b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨  b^{210, 4}_2
c    -b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_1
c    -b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨  b^{210, 4}_0
c  in DIMACS:
-22127 -22128  22129 -630  22130 0
-22127 -22128  22129 -630 -22131 0
-22127 -22128  22129 -630  22132 0

c  -1+1 --> 0
c    ( b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0 ∧  p_630) -> (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧ -b^{210, 4}_0)
c  in CNF:
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_2
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_1
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_0
c  in DIMACS:
-22127  22128 -22129 -630 -22130 0
-22127  22128 -22129 -630 -22131 0
-22127  22128 -22129 -630 -22132 0

c  0+1 --> 1
c    (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧  p_630) -> (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0)
c  in CNF:
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_2
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_1
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨  b^{210, 4}_0
c  in DIMACS:
 22127  22128  22129 -630 -22130 0
 22127  22128  22129 -630 -22131 0
 22127  22128  22129 -630  22132 0

c  1+1 --> 2
c    (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0 ∧  p_630) -> (-b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0)
c  in CNF:
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_2
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨  b^{210, 4}_1
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ -p_630 ∨ -b^{210, 4}_0
c  in DIMACS:
 22127  22128 -22129 -630 -22130 0
 22127  22128 -22129 -630  22131 0
 22127  22128 -22129 -630 -22132 0

c  2+1 --> break 
c    (-b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧  p_630) -> break
c  in CNF:
c     b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 22127 -22128  22129 -630 1162 0


c  2-1 --> 1
c    (-b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧ -p_630) -> (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0)
c  in CNF:
c     b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_2
c     b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_1
c     b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨  b^{210, 4}_0
c  in DIMACS:
 22127 -22128  22129  630 -22130 0
 22127 -22128  22129  630 -22131 0
 22127 -22128  22129  630  22132 0

c  1-1 --> 0
c    (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0 ∧ -p_630) -> (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧ -b^{210, 4}_0)
c  in CNF:
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_2
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_1
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_0
c  in DIMACS:
 22127  22128 -22129  630 -22130 0
 22127  22128 -22129  630 -22131 0
 22127  22128 -22129  630 -22132 0

c  0-1 --> -1
c    (-b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧ -p_630) -> ( b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0)
c  in CNF:
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨  b^{210, 4}_2
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_1
c     b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨  b^{210, 4}_0
c  in DIMACS:
 22127  22128  22129  630  22130 0
 22127  22128  22129  630 -22131 0
 22127  22128  22129  630  22132 0

c  -1-1 --> -2
c    ( b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧  b^{210, 3}_0 ∧ -p_630) -> ( b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0)
c  in CNF:
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨  b^{210, 4}_2
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨  b^{210, 4}_1
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨  p_630 ∨ -b^{210, 4}_0
c  in DIMACS:
-22127  22128 -22129  630  22130 0
-22127  22128 -22129  630  22131 0
-22127  22128 -22129  630 -22132 0

c  -2-1 --> break 
c    ( b^{210, 3}_2 ∧  b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨  b^{210, 3}_0 ∨  p_630 ∨ break
c  in DIMACS:
-22127 -22128  22129  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{210, 3}_2 ∧ -b^{210, 3}_1 ∧ -b^{210, 3}_0 ∧ true) 
c  in CNF:
c    -b^{210, 3}_2 ∨  b^{210, 3}_1 ∨  b^{210, 3}_0 ∨ false 
c  in DIMACS:
-22127  22128  22129  0

c  3 does not represent an automaton state.
c    -(-b^{210, 3}_2 ∧  b^{210, 3}_1 ∧  b^{210, 3}_0 ∧ true) 
c  in CNF:
c     b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ false 
c  in DIMACS:
 22127 -22128 -22129  0
c  -3 does not represent an automaton state.
c    -( b^{210, 3}_2 ∧  b^{210, 3}_1 ∧  b^{210, 3}_0 ∧ true) 
c  in CNF:
c    -b^{210, 3}_2 ∨ -b^{210, 3}_1 ∨ -b^{210, 3}_0 ∨ false 
c  in DIMACS:
-22127 -22128 -22129  0

c i = 4
c  -2+1 --> -1
c    ( b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧  p_840) -> ( b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0)
c  in CNF:
c    -b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨  b^{210, 5}_2
c    -b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_1
c    -b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨  b^{210, 5}_0
c  in DIMACS:
-22130 -22131  22132 -840  22133 0
-22130 -22131  22132 -840 -22134 0
-22130 -22131  22132 -840  22135 0

c  -1+1 --> 0
c    ( b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0 ∧  p_840) -> (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧ -b^{210, 5}_0)
c  in CNF:
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_2
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_1
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_0
c  in DIMACS:
-22130  22131 -22132 -840 -22133 0
-22130  22131 -22132 -840 -22134 0
-22130  22131 -22132 -840 -22135 0

c  0+1 --> 1
c    (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧  p_840) -> (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0)
c  in CNF:
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_2
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_1
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨  b^{210, 5}_0
c  in DIMACS:
 22130  22131  22132 -840 -22133 0
 22130  22131  22132 -840 -22134 0
 22130  22131  22132 -840  22135 0

c  1+1 --> 2
c    (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0 ∧  p_840) -> (-b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0)
c  in CNF:
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_2
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨  b^{210, 5}_1
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ -p_840 ∨ -b^{210, 5}_0
c  in DIMACS:
 22130  22131 -22132 -840 -22133 0
 22130  22131 -22132 -840  22134 0
 22130  22131 -22132 -840 -22135 0

c  2+1 --> break 
c    (-b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧  p_840) -> break
c  in CNF:
c     b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 22130 -22131  22132 -840 1162 0


c  2-1 --> 1
c    (-b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧ -p_840) -> (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0)
c  in CNF:
c     b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_2
c     b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_1
c     b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨  b^{210, 5}_0
c  in DIMACS:
 22130 -22131  22132  840 -22133 0
 22130 -22131  22132  840 -22134 0
 22130 -22131  22132  840  22135 0

c  1-1 --> 0
c    (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0 ∧ -p_840) -> (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧ -b^{210, 5}_0)
c  in CNF:
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_2
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_1
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_0
c  in DIMACS:
 22130  22131 -22132  840 -22133 0
 22130  22131 -22132  840 -22134 0
 22130  22131 -22132  840 -22135 0

c  0-1 --> -1
c    (-b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧ -p_840) -> ( b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0)
c  in CNF:
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨  b^{210, 5}_2
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_1
c     b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨  b^{210, 5}_0
c  in DIMACS:
 22130  22131  22132  840  22133 0
 22130  22131  22132  840 -22134 0
 22130  22131  22132  840  22135 0

c  -1-1 --> -2
c    ( b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧  b^{210, 4}_0 ∧ -p_840) -> ( b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0)
c  in CNF:
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨  b^{210, 5}_2
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨  b^{210, 5}_1
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨  p_840 ∨ -b^{210, 5}_0
c  in DIMACS:
-22130  22131 -22132  840  22133 0
-22130  22131 -22132  840  22134 0
-22130  22131 -22132  840 -22135 0

c  -2-1 --> break 
c    ( b^{210, 4}_2 ∧  b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨  b^{210, 4}_0 ∨  p_840 ∨ break
c  in DIMACS:
-22130 -22131  22132  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{210, 4}_2 ∧ -b^{210, 4}_1 ∧ -b^{210, 4}_0 ∧ true) 
c  in CNF:
c    -b^{210, 4}_2 ∨  b^{210, 4}_1 ∨  b^{210, 4}_0 ∨ false 
c  in DIMACS:
-22130  22131  22132  0

c  3 does not represent an automaton state.
c    -(-b^{210, 4}_2 ∧  b^{210, 4}_1 ∧  b^{210, 4}_0 ∧ true) 
c  in CNF:
c     b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ false 
c  in DIMACS:
 22130 -22131 -22132  0
c  -3 does not represent an automaton state.
c    -( b^{210, 4}_2 ∧  b^{210, 4}_1 ∧  b^{210, 4}_0 ∧ true) 
c  in CNF:
c    -b^{210, 4}_2 ∨ -b^{210, 4}_1 ∨ -b^{210, 4}_0 ∨ false 
c  in DIMACS:
-22130 -22131 -22132  0

c i = 5
c  -2+1 --> -1
c    ( b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧  p_1050) -> ( b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧  b^{210, 6}_0)
c  in CNF:
c    -b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨  b^{210, 6}_2
c    -b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_1
c    -b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨  b^{210, 6}_0
c  in DIMACS:
-22133 -22134  22135 -1050  22136 0
-22133 -22134  22135 -1050 -22137 0
-22133 -22134  22135 -1050  22138 0

c  -1+1 --> 0
c    ( b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0 ∧  p_1050) -> (-b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧ -b^{210, 6}_0)
c  in CNF:
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_2
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_1
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_0
c  in DIMACS:
-22133  22134 -22135 -1050 -22136 0
-22133  22134 -22135 -1050 -22137 0
-22133  22134 -22135 -1050 -22138 0

c  0+1 --> 1
c    (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧  p_1050) -> (-b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧  b^{210, 6}_0)
c  in CNF:
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_2
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_1
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨  b^{210, 6}_0
c  in DIMACS:
 22133  22134  22135 -1050 -22136 0
 22133  22134  22135 -1050 -22137 0
 22133  22134  22135 -1050  22138 0

c  1+1 --> 2
c    (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0 ∧  p_1050) -> (-b^{210, 6}_2 ∧  b^{210, 6}_1 ∧ -b^{210, 6}_0)
c  in CNF:
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_2
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨  b^{210, 6}_1
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ -p_1050 ∨ -b^{210, 6}_0
c  in DIMACS:
 22133  22134 -22135 -1050 -22136 0
 22133  22134 -22135 -1050  22137 0
 22133  22134 -22135 -1050 -22138 0

c  2+1 --> break 
c    (-b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 22133 -22134  22135 -1050 1162 0


c  2-1 --> 1
c    (-b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧ -p_1050) -> (-b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧  b^{210, 6}_0)
c  in CNF:
c     b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_2
c     b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_1
c     b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨  b^{210, 6}_0
c  in DIMACS:
 22133 -22134  22135  1050 -22136 0
 22133 -22134  22135  1050 -22137 0
 22133 -22134  22135  1050  22138 0

c  1-1 --> 0
c    (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0 ∧ -p_1050) -> (-b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧ -b^{210, 6}_0)
c  in CNF:
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_2
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_1
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_0
c  in DIMACS:
 22133  22134 -22135  1050 -22136 0
 22133  22134 -22135  1050 -22137 0
 22133  22134 -22135  1050 -22138 0

c  0-1 --> -1
c    (-b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧ -p_1050) -> ( b^{210, 6}_2 ∧ -b^{210, 6}_1 ∧  b^{210, 6}_0)
c  in CNF:
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨  b^{210, 6}_2
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_1
c     b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨  b^{210, 6}_0
c  in DIMACS:
 22133  22134  22135  1050  22136 0
 22133  22134  22135  1050 -22137 0
 22133  22134  22135  1050  22138 0

c  -1-1 --> -2
c    ( b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧  b^{210, 5}_0 ∧ -p_1050) -> ( b^{210, 6}_2 ∧  b^{210, 6}_1 ∧ -b^{210, 6}_0)
c  in CNF:
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨  b^{210, 6}_2
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨  b^{210, 6}_1
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨  p_1050 ∨ -b^{210, 6}_0
c  in DIMACS:
-22133  22134 -22135  1050  22136 0
-22133  22134 -22135  1050  22137 0
-22133  22134 -22135  1050 -22138 0

c  -2-1 --> break 
c    ( b^{210, 5}_2 ∧  b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨  b^{210, 5}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-22133 -22134  22135  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{210, 5}_2 ∧ -b^{210, 5}_1 ∧ -b^{210, 5}_0 ∧ true) 
c  in CNF:
c    -b^{210, 5}_2 ∨  b^{210, 5}_1 ∨  b^{210, 5}_0 ∨ false 
c  in DIMACS:
-22133  22134  22135  0

c  3 does not represent an automaton state.
c    -(-b^{210, 5}_2 ∧  b^{210, 5}_1 ∧  b^{210, 5}_0 ∧ true) 
c  in CNF:
c     b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ false 
c  in DIMACS:
 22133 -22134 -22135  0
c  -3 does not represent an automaton state.
c    -( b^{210, 5}_2 ∧  b^{210, 5}_1 ∧  b^{210, 5}_0 ∧ true) 
c  in CNF:
c    -b^{210, 5}_2 ∨ -b^{210, 5}_1 ∨ -b^{210, 5}_0 ∨ false 
c  in DIMACS:
-22133 -22134 -22135  0

c INIT for k = 211
c    -b^{211, 1}_2
c    -b^{211, 1}_1
c    -b^{211, 1}_0
c  in DIMACS:
-22139 0
-22140 0
-22141 0

c Transitions for k = 211
c i = 1
c  -2+1 --> -1
c    ( b^{211, 1}_2 ∧  b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧  p_211) -> ( b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0)
c  in CNF:
c    -b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨  b^{211, 2}_2
c    -b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_1
c    -b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨  b^{211, 2}_0
c  in DIMACS:
-22139 -22140  22141 -211  22142 0
-22139 -22140  22141 -211 -22143 0
-22139 -22140  22141 -211  22144 0

c  -1+1 --> 0
c    ( b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧  b^{211, 1}_0 ∧  p_211) -> (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧ -b^{211, 2}_0)
c  in CNF:
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_2
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_1
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_0
c  in DIMACS:
-22139  22140 -22141 -211 -22142 0
-22139  22140 -22141 -211 -22143 0
-22139  22140 -22141 -211 -22144 0

c  0+1 --> 1
c    (-b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧  p_211) -> (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0)
c  in CNF:
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_2
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_1
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨  b^{211, 2}_0
c  in DIMACS:
 22139  22140  22141 -211 -22142 0
 22139  22140  22141 -211 -22143 0
 22139  22140  22141 -211  22144 0

c  1+1 --> 2
c    (-b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧  b^{211, 1}_0 ∧  p_211) -> (-b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0)
c  in CNF:
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_2
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨  b^{211, 2}_1
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ -p_211 ∨ -b^{211, 2}_0
c  in DIMACS:
 22139  22140 -22141 -211 -22142 0
 22139  22140 -22141 -211  22143 0
 22139  22140 -22141 -211 -22144 0

c  2+1 --> break 
c    (-b^{211, 1}_2 ∧  b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧  p_211) -> break
c  in CNF:
c     b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ -p_211 ∨ break
c  in DIMACS:
 22139 -22140  22141 -211 1162 0


c  2-1 --> 1
c    (-b^{211, 1}_2 ∧  b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧ -p_211) -> (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0)
c  in CNF:
c     b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_2
c     b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_1
c     b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨  b^{211, 2}_0
c  in DIMACS:
 22139 -22140  22141  211 -22142 0
 22139 -22140  22141  211 -22143 0
 22139 -22140  22141  211  22144 0

c  1-1 --> 0
c    (-b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧  b^{211, 1}_0 ∧ -p_211) -> (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧ -b^{211, 2}_0)
c  in CNF:
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_2
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_1
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_0
c  in DIMACS:
 22139  22140 -22141  211 -22142 0
 22139  22140 -22141  211 -22143 0
 22139  22140 -22141  211 -22144 0

c  0-1 --> -1
c    (-b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧ -p_211) -> ( b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0)
c  in CNF:
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨  b^{211, 2}_2
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_1
c     b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨  b^{211, 2}_0
c  in DIMACS:
 22139  22140  22141  211  22142 0
 22139  22140  22141  211 -22143 0
 22139  22140  22141  211  22144 0

c  -1-1 --> -2
c    ( b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧  b^{211, 1}_0 ∧ -p_211) -> ( b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0)
c  in CNF:
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨  b^{211, 2}_2
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨  b^{211, 2}_1
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨  p_211 ∨ -b^{211, 2}_0
c  in DIMACS:
-22139  22140 -22141  211  22142 0
-22139  22140 -22141  211  22143 0
-22139  22140 -22141  211 -22144 0

c  -2-1 --> break 
c    ( b^{211, 1}_2 ∧  b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧ -p_211) -> break
c  in CNF:
c    -b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨  b^{211, 1}_0 ∨  p_211 ∨ break
c  in DIMACS:
-22139 -22140  22141  211 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{211, 1}_2 ∧ -b^{211, 1}_1 ∧ -b^{211, 1}_0 ∧ true) 
c  in CNF:
c    -b^{211, 1}_2 ∨  b^{211, 1}_1 ∨  b^{211, 1}_0 ∨ false 
c  in DIMACS:
-22139  22140  22141  0

c  3 does not represent an automaton state.
c    -(-b^{211, 1}_2 ∧  b^{211, 1}_1 ∧  b^{211, 1}_0 ∧ true) 
c  in CNF:
c     b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ false 
c  in DIMACS:
 22139 -22140 -22141  0
c  -3 does not represent an automaton state.
c    -( b^{211, 1}_2 ∧  b^{211, 1}_1 ∧  b^{211, 1}_0 ∧ true) 
c  in CNF:
c    -b^{211, 1}_2 ∨ -b^{211, 1}_1 ∨ -b^{211, 1}_0 ∨ false 
c  in DIMACS:
-22139 -22140 -22141  0

c i = 2
c  -2+1 --> -1
c    ( b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧  p_422) -> ( b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0)
c  in CNF:
c    -b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨  b^{211, 3}_2
c    -b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_1
c    -b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨  b^{211, 3}_0
c  in DIMACS:
-22142 -22143  22144 -422  22145 0
-22142 -22143  22144 -422 -22146 0
-22142 -22143  22144 -422  22147 0

c  -1+1 --> 0
c    ( b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0 ∧  p_422) -> (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧ -b^{211, 3}_0)
c  in CNF:
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_2
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_1
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_0
c  in DIMACS:
-22142  22143 -22144 -422 -22145 0
-22142  22143 -22144 -422 -22146 0
-22142  22143 -22144 -422 -22147 0

c  0+1 --> 1
c    (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧  p_422) -> (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0)
c  in CNF:
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_2
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_1
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨  b^{211, 3}_0
c  in DIMACS:
 22142  22143  22144 -422 -22145 0
 22142  22143  22144 -422 -22146 0
 22142  22143  22144 -422  22147 0

c  1+1 --> 2
c    (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0 ∧  p_422) -> (-b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0)
c  in CNF:
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_2
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨  b^{211, 3}_1
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ -p_422 ∨ -b^{211, 3}_0
c  in DIMACS:
 22142  22143 -22144 -422 -22145 0
 22142  22143 -22144 -422  22146 0
 22142  22143 -22144 -422 -22147 0

c  2+1 --> break 
c    (-b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧  p_422) -> break
c  in CNF:
c     b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ -p_422 ∨ break
c  in DIMACS:
 22142 -22143  22144 -422 1162 0


c  2-1 --> 1
c    (-b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧ -p_422) -> (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0)
c  in CNF:
c     b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_2
c     b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_1
c     b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨  b^{211, 3}_0
c  in DIMACS:
 22142 -22143  22144  422 -22145 0
 22142 -22143  22144  422 -22146 0
 22142 -22143  22144  422  22147 0

c  1-1 --> 0
c    (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0 ∧ -p_422) -> (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧ -b^{211, 3}_0)
c  in CNF:
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_2
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_1
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_0
c  in DIMACS:
 22142  22143 -22144  422 -22145 0
 22142  22143 -22144  422 -22146 0
 22142  22143 -22144  422 -22147 0

c  0-1 --> -1
c    (-b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧ -p_422) -> ( b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0)
c  in CNF:
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨  b^{211, 3}_2
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_1
c     b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨  b^{211, 3}_0
c  in DIMACS:
 22142  22143  22144  422  22145 0
 22142  22143  22144  422 -22146 0
 22142  22143  22144  422  22147 0

c  -1-1 --> -2
c    ( b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧  b^{211, 2}_0 ∧ -p_422) -> ( b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0)
c  in CNF:
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨  b^{211, 3}_2
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨  b^{211, 3}_1
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨  p_422 ∨ -b^{211, 3}_0
c  in DIMACS:
-22142  22143 -22144  422  22145 0
-22142  22143 -22144  422  22146 0
-22142  22143 -22144  422 -22147 0

c  -2-1 --> break 
c    ( b^{211, 2}_2 ∧  b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧ -p_422) -> break
c  in CNF:
c    -b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨  b^{211, 2}_0 ∨  p_422 ∨ break
c  in DIMACS:
-22142 -22143  22144  422 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{211, 2}_2 ∧ -b^{211, 2}_1 ∧ -b^{211, 2}_0 ∧ true) 
c  in CNF:
c    -b^{211, 2}_2 ∨  b^{211, 2}_1 ∨  b^{211, 2}_0 ∨ false 
c  in DIMACS:
-22142  22143  22144  0

c  3 does not represent an automaton state.
c    -(-b^{211, 2}_2 ∧  b^{211, 2}_1 ∧  b^{211, 2}_0 ∧ true) 
c  in CNF:
c     b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ false 
c  in DIMACS:
 22142 -22143 -22144  0
c  -3 does not represent an automaton state.
c    -( b^{211, 2}_2 ∧  b^{211, 2}_1 ∧  b^{211, 2}_0 ∧ true) 
c  in CNF:
c    -b^{211, 2}_2 ∨ -b^{211, 2}_1 ∨ -b^{211, 2}_0 ∨ false 
c  in DIMACS:
-22142 -22143 -22144  0

c i = 3
c  -2+1 --> -1
c    ( b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧  p_633) -> ( b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0)
c  in CNF:
c    -b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨  b^{211, 4}_2
c    -b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_1
c    -b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨  b^{211, 4}_0
c  in DIMACS:
-22145 -22146  22147 -633  22148 0
-22145 -22146  22147 -633 -22149 0
-22145 -22146  22147 -633  22150 0

c  -1+1 --> 0
c    ( b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0 ∧  p_633) -> (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧ -b^{211, 4}_0)
c  in CNF:
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_2
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_1
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_0
c  in DIMACS:
-22145  22146 -22147 -633 -22148 0
-22145  22146 -22147 -633 -22149 0
-22145  22146 -22147 -633 -22150 0

c  0+1 --> 1
c    (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧  p_633) -> (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0)
c  in CNF:
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_2
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_1
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨  b^{211, 4}_0
c  in DIMACS:
 22145  22146  22147 -633 -22148 0
 22145  22146  22147 -633 -22149 0
 22145  22146  22147 -633  22150 0

c  1+1 --> 2
c    (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0 ∧  p_633) -> (-b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0)
c  in CNF:
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_2
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨  b^{211, 4}_1
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ -p_633 ∨ -b^{211, 4}_0
c  in DIMACS:
 22145  22146 -22147 -633 -22148 0
 22145  22146 -22147 -633  22149 0
 22145  22146 -22147 -633 -22150 0

c  2+1 --> break 
c    (-b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧  p_633) -> break
c  in CNF:
c     b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ -p_633 ∨ break
c  in DIMACS:
 22145 -22146  22147 -633 1162 0


c  2-1 --> 1
c    (-b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧ -p_633) -> (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0)
c  in CNF:
c     b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_2
c     b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_1
c     b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨  b^{211, 4}_0
c  in DIMACS:
 22145 -22146  22147  633 -22148 0
 22145 -22146  22147  633 -22149 0
 22145 -22146  22147  633  22150 0

c  1-1 --> 0
c    (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0 ∧ -p_633) -> (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧ -b^{211, 4}_0)
c  in CNF:
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_2
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_1
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_0
c  in DIMACS:
 22145  22146 -22147  633 -22148 0
 22145  22146 -22147  633 -22149 0
 22145  22146 -22147  633 -22150 0

c  0-1 --> -1
c    (-b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧ -p_633) -> ( b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0)
c  in CNF:
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨  b^{211, 4}_2
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_1
c     b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨  b^{211, 4}_0
c  in DIMACS:
 22145  22146  22147  633  22148 0
 22145  22146  22147  633 -22149 0
 22145  22146  22147  633  22150 0

c  -1-1 --> -2
c    ( b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧  b^{211, 3}_0 ∧ -p_633) -> ( b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0)
c  in CNF:
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨  b^{211, 4}_2
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨  b^{211, 4}_1
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨  p_633 ∨ -b^{211, 4}_0
c  in DIMACS:
-22145  22146 -22147  633  22148 0
-22145  22146 -22147  633  22149 0
-22145  22146 -22147  633 -22150 0

c  -2-1 --> break 
c    ( b^{211, 3}_2 ∧  b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧ -p_633) -> break
c  in CNF:
c    -b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨  b^{211, 3}_0 ∨  p_633 ∨ break
c  in DIMACS:
-22145 -22146  22147  633 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{211, 3}_2 ∧ -b^{211, 3}_1 ∧ -b^{211, 3}_0 ∧ true) 
c  in CNF:
c    -b^{211, 3}_2 ∨  b^{211, 3}_1 ∨  b^{211, 3}_0 ∨ false 
c  in DIMACS:
-22145  22146  22147  0

c  3 does not represent an automaton state.
c    -(-b^{211, 3}_2 ∧  b^{211, 3}_1 ∧  b^{211, 3}_0 ∧ true) 
c  in CNF:
c     b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ false 
c  in DIMACS:
 22145 -22146 -22147  0
c  -3 does not represent an automaton state.
c    -( b^{211, 3}_2 ∧  b^{211, 3}_1 ∧  b^{211, 3}_0 ∧ true) 
c  in CNF:
c    -b^{211, 3}_2 ∨ -b^{211, 3}_1 ∨ -b^{211, 3}_0 ∨ false 
c  in DIMACS:
-22145 -22146 -22147  0

c i = 4
c  -2+1 --> -1
c    ( b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧  p_844) -> ( b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0)
c  in CNF:
c    -b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨  b^{211, 5}_2
c    -b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_1
c    -b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨  b^{211, 5}_0
c  in DIMACS:
-22148 -22149  22150 -844  22151 0
-22148 -22149  22150 -844 -22152 0
-22148 -22149  22150 -844  22153 0

c  -1+1 --> 0
c    ( b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0 ∧  p_844) -> (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧ -b^{211, 5}_0)
c  in CNF:
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_2
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_1
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_0
c  in DIMACS:
-22148  22149 -22150 -844 -22151 0
-22148  22149 -22150 -844 -22152 0
-22148  22149 -22150 -844 -22153 0

c  0+1 --> 1
c    (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧  p_844) -> (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0)
c  in CNF:
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_2
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_1
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨  b^{211, 5}_0
c  in DIMACS:
 22148  22149  22150 -844 -22151 0
 22148  22149  22150 -844 -22152 0
 22148  22149  22150 -844  22153 0

c  1+1 --> 2
c    (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0 ∧  p_844) -> (-b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0)
c  in CNF:
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_2
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨  b^{211, 5}_1
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ -p_844 ∨ -b^{211, 5}_0
c  in DIMACS:
 22148  22149 -22150 -844 -22151 0
 22148  22149 -22150 -844  22152 0
 22148  22149 -22150 -844 -22153 0

c  2+1 --> break 
c    (-b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧  p_844) -> break
c  in CNF:
c     b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ -p_844 ∨ break
c  in DIMACS:
 22148 -22149  22150 -844 1162 0


c  2-1 --> 1
c    (-b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧ -p_844) -> (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0)
c  in CNF:
c     b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_2
c     b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_1
c     b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨  b^{211, 5}_0
c  in DIMACS:
 22148 -22149  22150  844 -22151 0
 22148 -22149  22150  844 -22152 0
 22148 -22149  22150  844  22153 0

c  1-1 --> 0
c    (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0 ∧ -p_844) -> (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧ -b^{211, 5}_0)
c  in CNF:
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_2
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_1
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_0
c  in DIMACS:
 22148  22149 -22150  844 -22151 0
 22148  22149 -22150  844 -22152 0
 22148  22149 -22150  844 -22153 0

c  0-1 --> -1
c    (-b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧ -p_844) -> ( b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0)
c  in CNF:
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨  b^{211, 5}_2
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_1
c     b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨  b^{211, 5}_0
c  in DIMACS:
 22148  22149  22150  844  22151 0
 22148  22149  22150  844 -22152 0
 22148  22149  22150  844  22153 0

c  -1-1 --> -2
c    ( b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧  b^{211, 4}_0 ∧ -p_844) -> ( b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0)
c  in CNF:
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨  b^{211, 5}_2
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨  b^{211, 5}_1
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨  p_844 ∨ -b^{211, 5}_0
c  in DIMACS:
-22148  22149 -22150  844  22151 0
-22148  22149 -22150  844  22152 0
-22148  22149 -22150  844 -22153 0

c  -2-1 --> break 
c    ( b^{211, 4}_2 ∧  b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧ -p_844) -> break
c  in CNF:
c    -b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨  b^{211, 4}_0 ∨  p_844 ∨ break
c  in DIMACS:
-22148 -22149  22150  844 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{211, 4}_2 ∧ -b^{211, 4}_1 ∧ -b^{211, 4}_0 ∧ true) 
c  in CNF:
c    -b^{211, 4}_2 ∨  b^{211, 4}_1 ∨  b^{211, 4}_0 ∨ false 
c  in DIMACS:
-22148  22149  22150  0

c  3 does not represent an automaton state.
c    -(-b^{211, 4}_2 ∧  b^{211, 4}_1 ∧  b^{211, 4}_0 ∧ true) 
c  in CNF:
c     b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ false 
c  in DIMACS:
 22148 -22149 -22150  0
c  -3 does not represent an automaton state.
c    -( b^{211, 4}_2 ∧  b^{211, 4}_1 ∧  b^{211, 4}_0 ∧ true) 
c  in CNF:
c    -b^{211, 4}_2 ∨ -b^{211, 4}_1 ∨ -b^{211, 4}_0 ∨ false 
c  in DIMACS:
-22148 -22149 -22150  0

c i = 5
c  -2+1 --> -1
c    ( b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧  p_1055) -> ( b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧  b^{211, 6}_0)
c  in CNF:
c    -b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨  b^{211, 6}_2
c    -b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_1
c    -b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨  b^{211, 6}_0
c  in DIMACS:
-22151 -22152  22153 -1055  22154 0
-22151 -22152  22153 -1055 -22155 0
-22151 -22152  22153 -1055  22156 0

c  -1+1 --> 0
c    ( b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0 ∧  p_1055) -> (-b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧ -b^{211, 6}_0)
c  in CNF:
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_2
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_1
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_0
c  in DIMACS:
-22151  22152 -22153 -1055 -22154 0
-22151  22152 -22153 -1055 -22155 0
-22151  22152 -22153 -1055 -22156 0

c  0+1 --> 1
c    (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧  p_1055) -> (-b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧  b^{211, 6}_0)
c  in CNF:
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_2
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_1
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨  b^{211, 6}_0
c  in DIMACS:
 22151  22152  22153 -1055 -22154 0
 22151  22152  22153 -1055 -22155 0
 22151  22152  22153 -1055  22156 0

c  1+1 --> 2
c    (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0 ∧  p_1055) -> (-b^{211, 6}_2 ∧  b^{211, 6}_1 ∧ -b^{211, 6}_0)
c  in CNF:
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_2
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨  b^{211, 6}_1
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ -p_1055 ∨ -b^{211, 6}_0
c  in DIMACS:
 22151  22152 -22153 -1055 -22154 0
 22151  22152 -22153 -1055  22155 0
 22151  22152 -22153 -1055 -22156 0

c  2+1 --> break 
c    (-b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧  p_1055) -> break
c  in CNF:
c     b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ -p_1055 ∨ break
c  in DIMACS:
 22151 -22152  22153 -1055 1162 0


c  2-1 --> 1
c    (-b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧ -p_1055) -> (-b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧  b^{211, 6}_0)
c  in CNF:
c     b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_2
c     b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_1
c     b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨  b^{211, 6}_0
c  in DIMACS:
 22151 -22152  22153  1055 -22154 0
 22151 -22152  22153  1055 -22155 0
 22151 -22152  22153  1055  22156 0

c  1-1 --> 0
c    (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0 ∧ -p_1055) -> (-b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧ -b^{211, 6}_0)
c  in CNF:
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_2
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_1
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_0
c  in DIMACS:
 22151  22152 -22153  1055 -22154 0
 22151  22152 -22153  1055 -22155 0
 22151  22152 -22153  1055 -22156 0

c  0-1 --> -1
c    (-b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧ -p_1055) -> ( b^{211, 6}_2 ∧ -b^{211, 6}_1 ∧  b^{211, 6}_0)
c  in CNF:
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨  b^{211, 6}_2
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_1
c     b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨  b^{211, 6}_0
c  in DIMACS:
 22151  22152  22153  1055  22154 0
 22151  22152  22153  1055 -22155 0
 22151  22152  22153  1055  22156 0

c  -1-1 --> -2
c    ( b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧  b^{211, 5}_0 ∧ -p_1055) -> ( b^{211, 6}_2 ∧  b^{211, 6}_1 ∧ -b^{211, 6}_0)
c  in CNF:
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨  b^{211, 6}_2
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨  b^{211, 6}_1
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨  p_1055 ∨ -b^{211, 6}_0
c  in DIMACS:
-22151  22152 -22153  1055  22154 0
-22151  22152 -22153  1055  22155 0
-22151  22152 -22153  1055 -22156 0

c  -2-1 --> break 
c    ( b^{211, 5}_2 ∧  b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧ -p_1055) -> break
c  in CNF:
c    -b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨  b^{211, 5}_0 ∨  p_1055 ∨ break
c  in DIMACS:
-22151 -22152  22153  1055 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{211, 5}_2 ∧ -b^{211, 5}_1 ∧ -b^{211, 5}_0 ∧ true) 
c  in CNF:
c    -b^{211, 5}_2 ∨  b^{211, 5}_1 ∨  b^{211, 5}_0 ∨ false 
c  in DIMACS:
-22151  22152  22153  0

c  3 does not represent an automaton state.
c    -(-b^{211, 5}_2 ∧  b^{211, 5}_1 ∧  b^{211, 5}_0 ∧ true) 
c  in CNF:
c     b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ false 
c  in DIMACS:
 22151 -22152 -22153  0
c  -3 does not represent an automaton state.
c    -( b^{211, 5}_2 ∧  b^{211, 5}_1 ∧  b^{211, 5}_0 ∧ true) 
c  in CNF:
c    -b^{211, 5}_2 ∨ -b^{211, 5}_1 ∨ -b^{211, 5}_0 ∨ false 
c  in DIMACS:
-22151 -22152 -22153  0

c INIT for k = 212
c    -b^{212, 1}_2
c    -b^{212, 1}_1
c    -b^{212, 1}_0
c  in DIMACS:
-22157 0
-22158 0
-22159 0

c Transitions for k = 212
c i = 1
c  -2+1 --> -1
c    ( b^{212, 1}_2 ∧  b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧  p_212) -> ( b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0)
c  in CNF:
c    -b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨  b^{212, 2}_2
c    -b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_1
c    -b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨  b^{212, 2}_0
c  in DIMACS:
-22157 -22158  22159 -212  22160 0
-22157 -22158  22159 -212 -22161 0
-22157 -22158  22159 -212  22162 0

c  -1+1 --> 0
c    ( b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧  b^{212, 1}_0 ∧  p_212) -> (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧ -b^{212, 2}_0)
c  in CNF:
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_2
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_1
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_0
c  in DIMACS:
-22157  22158 -22159 -212 -22160 0
-22157  22158 -22159 -212 -22161 0
-22157  22158 -22159 -212 -22162 0

c  0+1 --> 1
c    (-b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧  p_212) -> (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0)
c  in CNF:
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_2
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_1
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨  b^{212, 2}_0
c  in DIMACS:
 22157  22158  22159 -212 -22160 0
 22157  22158  22159 -212 -22161 0
 22157  22158  22159 -212  22162 0

c  1+1 --> 2
c    (-b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧  b^{212, 1}_0 ∧  p_212) -> (-b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0)
c  in CNF:
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_2
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨  b^{212, 2}_1
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ -p_212 ∨ -b^{212, 2}_0
c  in DIMACS:
 22157  22158 -22159 -212 -22160 0
 22157  22158 -22159 -212  22161 0
 22157  22158 -22159 -212 -22162 0

c  2+1 --> break 
c    (-b^{212, 1}_2 ∧  b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧  p_212) -> break
c  in CNF:
c     b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ -p_212 ∨ break
c  in DIMACS:
 22157 -22158  22159 -212 1162 0


c  2-1 --> 1
c    (-b^{212, 1}_2 ∧  b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧ -p_212) -> (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0)
c  in CNF:
c     b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_2
c     b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_1
c     b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨  b^{212, 2}_0
c  in DIMACS:
 22157 -22158  22159  212 -22160 0
 22157 -22158  22159  212 -22161 0
 22157 -22158  22159  212  22162 0

c  1-1 --> 0
c    (-b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧  b^{212, 1}_0 ∧ -p_212) -> (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧ -b^{212, 2}_0)
c  in CNF:
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_2
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_1
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_0
c  in DIMACS:
 22157  22158 -22159  212 -22160 0
 22157  22158 -22159  212 -22161 0
 22157  22158 -22159  212 -22162 0

c  0-1 --> -1
c    (-b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧ -p_212) -> ( b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0)
c  in CNF:
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨  b^{212, 2}_2
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_1
c     b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨  b^{212, 2}_0
c  in DIMACS:
 22157  22158  22159  212  22160 0
 22157  22158  22159  212 -22161 0
 22157  22158  22159  212  22162 0

c  -1-1 --> -2
c    ( b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧  b^{212, 1}_0 ∧ -p_212) -> ( b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0)
c  in CNF:
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨  b^{212, 2}_2
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨  b^{212, 2}_1
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨  p_212 ∨ -b^{212, 2}_0
c  in DIMACS:
-22157  22158 -22159  212  22160 0
-22157  22158 -22159  212  22161 0
-22157  22158 -22159  212 -22162 0

c  -2-1 --> break 
c    ( b^{212, 1}_2 ∧  b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧ -p_212) -> break
c  in CNF:
c    -b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨  b^{212, 1}_0 ∨  p_212 ∨ break
c  in DIMACS:
-22157 -22158  22159  212 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{212, 1}_2 ∧ -b^{212, 1}_1 ∧ -b^{212, 1}_0 ∧ true) 
c  in CNF:
c    -b^{212, 1}_2 ∨  b^{212, 1}_1 ∨  b^{212, 1}_0 ∨ false 
c  in DIMACS:
-22157  22158  22159  0

c  3 does not represent an automaton state.
c    -(-b^{212, 1}_2 ∧  b^{212, 1}_1 ∧  b^{212, 1}_0 ∧ true) 
c  in CNF:
c     b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ false 
c  in DIMACS:
 22157 -22158 -22159  0
c  -3 does not represent an automaton state.
c    -( b^{212, 1}_2 ∧  b^{212, 1}_1 ∧  b^{212, 1}_0 ∧ true) 
c  in CNF:
c    -b^{212, 1}_2 ∨ -b^{212, 1}_1 ∨ -b^{212, 1}_0 ∨ false 
c  in DIMACS:
-22157 -22158 -22159  0

c i = 2
c  -2+1 --> -1
c    ( b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧  p_424) -> ( b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0)
c  in CNF:
c    -b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨  b^{212, 3}_2
c    -b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_1
c    -b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨  b^{212, 3}_0
c  in DIMACS:
-22160 -22161  22162 -424  22163 0
-22160 -22161  22162 -424 -22164 0
-22160 -22161  22162 -424  22165 0

c  -1+1 --> 0
c    ( b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0 ∧  p_424) -> (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧ -b^{212, 3}_0)
c  in CNF:
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_2
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_1
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_0
c  in DIMACS:
-22160  22161 -22162 -424 -22163 0
-22160  22161 -22162 -424 -22164 0
-22160  22161 -22162 -424 -22165 0

c  0+1 --> 1
c    (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧  p_424) -> (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0)
c  in CNF:
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_2
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_1
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨  b^{212, 3}_0
c  in DIMACS:
 22160  22161  22162 -424 -22163 0
 22160  22161  22162 -424 -22164 0
 22160  22161  22162 -424  22165 0

c  1+1 --> 2
c    (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0 ∧  p_424) -> (-b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0)
c  in CNF:
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_2
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨  b^{212, 3}_1
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ -p_424 ∨ -b^{212, 3}_0
c  in DIMACS:
 22160  22161 -22162 -424 -22163 0
 22160  22161 -22162 -424  22164 0
 22160  22161 -22162 -424 -22165 0

c  2+1 --> break 
c    (-b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧  p_424) -> break
c  in CNF:
c     b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ -p_424 ∨ break
c  in DIMACS:
 22160 -22161  22162 -424 1162 0


c  2-1 --> 1
c    (-b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧ -p_424) -> (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0)
c  in CNF:
c     b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_2
c     b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_1
c     b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨  b^{212, 3}_0
c  in DIMACS:
 22160 -22161  22162  424 -22163 0
 22160 -22161  22162  424 -22164 0
 22160 -22161  22162  424  22165 0

c  1-1 --> 0
c    (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0 ∧ -p_424) -> (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧ -b^{212, 3}_0)
c  in CNF:
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_2
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_1
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_0
c  in DIMACS:
 22160  22161 -22162  424 -22163 0
 22160  22161 -22162  424 -22164 0
 22160  22161 -22162  424 -22165 0

c  0-1 --> -1
c    (-b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧ -p_424) -> ( b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0)
c  in CNF:
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨  b^{212, 3}_2
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_1
c     b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨  b^{212, 3}_0
c  in DIMACS:
 22160  22161  22162  424  22163 0
 22160  22161  22162  424 -22164 0
 22160  22161  22162  424  22165 0

c  -1-1 --> -2
c    ( b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧  b^{212, 2}_0 ∧ -p_424) -> ( b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0)
c  in CNF:
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨  b^{212, 3}_2
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨  b^{212, 3}_1
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨  p_424 ∨ -b^{212, 3}_0
c  in DIMACS:
-22160  22161 -22162  424  22163 0
-22160  22161 -22162  424  22164 0
-22160  22161 -22162  424 -22165 0

c  -2-1 --> break 
c    ( b^{212, 2}_2 ∧  b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧ -p_424) -> break
c  in CNF:
c    -b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨  b^{212, 2}_0 ∨  p_424 ∨ break
c  in DIMACS:
-22160 -22161  22162  424 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{212, 2}_2 ∧ -b^{212, 2}_1 ∧ -b^{212, 2}_0 ∧ true) 
c  in CNF:
c    -b^{212, 2}_2 ∨  b^{212, 2}_1 ∨  b^{212, 2}_0 ∨ false 
c  in DIMACS:
-22160  22161  22162  0

c  3 does not represent an automaton state.
c    -(-b^{212, 2}_2 ∧  b^{212, 2}_1 ∧  b^{212, 2}_0 ∧ true) 
c  in CNF:
c     b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ false 
c  in DIMACS:
 22160 -22161 -22162  0
c  -3 does not represent an automaton state.
c    -( b^{212, 2}_2 ∧  b^{212, 2}_1 ∧  b^{212, 2}_0 ∧ true) 
c  in CNF:
c    -b^{212, 2}_2 ∨ -b^{212, 2}_1 ∨ -b^{212, 2}_0 ∨ false 
c  in DIMACS:
-22160 -22161 -22162  0

c i = 3
c  -2+1 --> -1
c    ( b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧  p_636) -> ( b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0)
c  in CNF:
c    -b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨  b^{212, 4}_2
c    -b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_1
c    -b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨  b^{212, 4}_0
c  in DIMACS:
-22163 -22164  22165 -636  22166 0
-22163 -22164  22165 -636 -22167 0
-22163 -22164  22165 -636  22168 0

c  -1+1 --> 0
c    ( b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0 ∧  p_636) -> (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧ -b^{212, 4}_0)
c  in CNF:
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_2
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_1
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_0
c  in DIMACS:
-22163  22164 -22165 -636 -22166 0
-22163  22164 -22165 -636 -22167 0
-22163  22164 -22165 -636 -22168 0

c  0+1 --> 1
c    (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧  p_636) -> (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0)
c  in CNF:
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_2
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_1
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨  b^{212, 4}_0
c  in DIMACS:
 22163  22164  22165 -636 -22166 0
 22163  22164  22165 -636 -22167 0
 22163  22164  22165 -636  22168 0

c  1+1 --> 2
c    (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0 ∧  p_636) -> (-b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0)
c  in CNF:
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_2
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨  b^{212, 4}_1
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ -p_636 ∨ -b^{212, 4}_0
c  in DIMACS:
 22163  22164 -22165 -636 -22166 0
 22163  22164 -22165 -636  22167 0
 22163  22164 -22165 -636 -22168 0

c  2+1 --> break 
c    (-b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧  p_636) -> break
c  in CNF:
c     b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 22163 -22164  22165 -636 1162 0


c  2-1 --> 1
c    (-b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧ -p_636) -> (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0)
c  in CNF:
c     b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_2
c     b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_1
c     b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨  b^{212, 4}_0
c  in DIMACS:
 22163 -22164  22165  636 -22166 0
 22163 -22164  22165  636 -22167 0
 22163 -22164  22165  636  22168 0

c  1-1 --> 0
c    (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0 ∧ -p_636) -> (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧ -b^{212, 4}_0)
c  in CNF:
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_2
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_1
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_0
c  in DIMACS:
 22163  22164 -22165  636 -22166 0
 22163  22164 -22165  636 -22167 0
 22163  22164 -22165  636 -22168 0

c  0-1 --> -1
c    (-b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧ -p_636) -> ( b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0)
c  in CNF:
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨  b^{212, 4}_2
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_1
c     b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨  b^{212, 4}_0
c  in DIMACS:
 22163  22164  22165  636  22166 0
 22163  22164  22165  636 -22167 0
 22163  22164  22165  636  22168 0

c  -1-1 --> -2
c    ( b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧  b^{212, 3}_0 ∧ -p_636) -> ( b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0)
c  in CNF:
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨  b^{212, 4}_2
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨  b^{212, 4}_1
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨  p_636 ∨ -b^{212, 4}_0
c  in DIMACS:
-22163  22164 -22165  636  22166 0
-22163  22164 -22165  636  22167 0
-22163  22164 -22165  636 -22168 0

c  -2-1 --> break 
c    ( b^{212, 3}_2 ∧  b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨  b^{212, 3}_0 ∨  p_636 ∨ break
c  in DIMACS:
-22163 -22164  22165  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{212, 3}_2 ∧ -b^{212, 3}_1 ∧ -b^{212, 3}_0 ∧ true) 
c  in CNF:
c    -b^{212, 3}_2 ∨  b^{212, 3}_1 ∨  b^{212, 3}_0 ∨ false 
c  in DIMACS:
-22163  22164  22165  0

c  3 does not represent an automaton state.
c    -(-b^{212, 3}_2 ∧  b^{212, 3}_1 ∧  b^{212, 3}_0 ∧ true) 
c  in CNF:
c     b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ false 
c  in DIMACS:
 22163 -22164 -22165  0
c  -3 does not represent an automaton state.
c    -( b^{212, 3}_2 ∧  b^{212, 3}_1 ∧  b^{212, 3}_0 ∧ true) 
c  in CNF:
c    -b^{212, 3}_2 ∨ -b^{212, 3}_1 ∨ -b^{212, 3}_0 ∨ false 
c  in DIMACS:
-22163 -22164 -22165  0

c i = 4
c  -2+1 --> -1
c    ( b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧  p_848) -> ( b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0)
c  in CNF:
c    -b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨  b^{212, 5}_2
c    -b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_1
c    -b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨  b^{212, 5}_0
c  in DIMACS:
-22166 -22167  22168 -848  22169 0
-22166 -22167  22168 -848 -22170 0
-22166 -22167  22168 -848  22171 0

c  -1+1 --> 0
c    ( b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0 ∧  p_848) -> (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧ -b^{212, 5}_0)
c  in CNF:
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_2
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_1
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_0
c  in DIMACS:
-22166  22167 -22168 -848 -22169 0
-22166  22167 -22168 -848 -22170 0
-22166  22167 -22168 -848 -22171 0

c  0+1 --> 1
c    (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧  p_848) -> (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0)
c  in CNF:
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_2
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_1
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨  b^{212, 5}_0
c  in DIMACS:
 22166  22167  22168 -848 -22169 0
 22166  22167  22168 -848 -22170 0
 22166  22167  22168 -848  22171 0

c  1+1 --> 2
c    (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0 ∧  p_848) -> (-b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0)
c  in CNF:
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_2
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨  b^{212, 5}_1
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ -p_848 ∨ -b^{212, 5}_0
c  in DIMACS:
 22166  22167 -22168 -848 -22169 0
 22166  22167 -22168 -848  22170 0
 22166  22167 -22168 -848 -22171 0

c  2+1 --> break 
c    (-b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧  p_848) -> break
c  in CNF:
c     b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ -p_848 ∨ break
c  in DIMACS:
 22166 -22167  22168 -848 1162 0


c  2-1 --> 1
c    (-b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧ -p_848) -> (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0)
c  in CNF:
c     b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_2
c     b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_1
c     b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨  b^{212, 5}_0
c  in DIMACS:
 22166 -22167  22168  848 -22169 0
 22166 -22167  22168  848 -22170 0
 22166 -22167  22168  848  22171 0

c  1-1 --> 0
c    (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0 ∧ -p_848) -> (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧ -b^{212, 5}_0)
c  in CNF:
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_2
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_1
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_0
c  in DIMACS:
 22166  22167 -22168  848 -22169 0
 22166  22167 -22168  848 -22170 0
 22166  22167 -22168  848 -22171 0

c  0-1 --> -1
c    (-b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧ -p_848) -> ( b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0)
c  in CNF:
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨  b^{212, 5}_2
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_1
c     b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨  b^{212, 5}_0
c  in DIMACS:
 22166  22167  22168  848  22169 0
 22166  22167  22168  848 -22170 0
 22166  22167  22168  848  22171 0

c  -1-1 --> -2
c    ( b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧  b^{212, 4}_0 ∧ -p_848) -> ( b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0)
c  in CNF:
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨  b^{212, 5}_2
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨  b^{212, 5}_1
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨  p_848 ∨ -b^{212, 5}_0
c  in DIMACS:
-22166  22167 -22168  848  22169 0
-22166  22167 -22168  848  22170 0
-22166  22167 -22168  848 -22171 0

c  -2-1 --> break 
c    ( b^{212, 4}_2 ∧  b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧ -p_848) -> break
c  in CNF:
c    -b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨  b^{212, 4}_0 ∨  p_848 ∨ break
c  in DIMACS:
-22166 -22167  22168  848 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{212, 4}_2 ∧ -b^{212, 4}_1 ∧ -b^{212, 4}_0 ∧ true) 
c  in CNF:
c    -b^{212, 4}_2 ∨  b^{212, 4}_1 ∨  b^{212, 4}_0 ∨ false 
c  in DIMACS:
-22166  22167  22168  0

c  3 does not represent an automaton state.
c    -(-b^{212, 4}_2 ∧  b^{212, 4}_1 ∧  b^{212, 4}_0 ∧ true) 
c  in CNF:
c     b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ false 
c  in DIMACS:
 22166 -22167 -22168  0
c  -3 does not represent an automaton state.
c    -( b^{212, 4}_2 ∧  b^{212, 4}_1 ∧  b^{212, 4}_0 ∧ true) 
c  in CNF:
c    -b^{212, 4}_2 ∨ -b^{212, 4}_1 ∨ -b^{212, 4}_0 ∨ false 
c  in DIMACS:
-22166 -22167 -22168  0

c i = 5
c  -2+1 --> -1
c    ( b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧  p_1060) -> ( b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧  b^{212, 6}_0)
c  in CNF:
c    -b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨  b^{212, 6}_2
c    -b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_1
c    -b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨  b^{212, 6}_0
c  in DIMACS:
-22169 -22170  22171 -1060  22172 0
-22169 -22170  22171 -1060 -22173 0
-22169 -22170  22171 -1060  22174 0

c  -1+1 --> 0
c    ( b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0 ∧  p_1060) -> (-b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧ -b^{212, 6}_0)
c  in CNF:
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_2
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_1
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_0
c  in DIMACS:
-22169  22170 -22171 -1060 -22172 0
-22169  22170 -22171 -1060 -22173 0
-22169  22170 -22171 -1060 -22174 0

c  0+1 --> 1
c    (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧  p_1060) -> (-b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧  b^{212, 6}_0)
c  in CNF:
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_2
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_1
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨  b^{212, 6}_0
c  in DIMACS:
 22169  22170  22171 -1060 -22172 0
 22169  22170  22171 -1060 -22173 0
 22169  22170  22171 -1060  22174 0

c  1+1 --> 2
c    (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0 ∧  p_1060) -> (-b^{212, 6}_2 ∧  b^{212, 6}_1 ∧ -b^{212, 6}_0)
c  in CNF:
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_2
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨  b^{212, 6}_1
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ -p_1060 ∨ -b^{212, 6}_0
c  in DIMACS:
 22169  22170 -22171 -1060 -22172 0
 22169  22170 -22171 -1060  22173 0
 22169  22170 -22171 -1060 -22174 0

c  2+1 --> break 
c    (-b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 22169 -22170  22171 -1060 1162 0


c  2-1 --> 1
c    (-b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧ -p_1060) -> (-b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧  b^{212, 6}_0)
c  in CNF:
c     b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_2
c     b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_1
c     b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨  b^{212, 6}_0
c  in DIMACS:
 22169 -22170  22171  1060 -22172 0
 22169 -22170  22171  1060 -22173 0
 22169 -22170  22171  1060  22174 0

c  1-1 --> 0
c    (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0 ∧ -p_1060) -> (-b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧ -b^{212, 6}_0)
c  in CNF:
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_2
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_1
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_0
c  in DIMACS:
 22169  22170 -22171  1060 -22172 0
 22169  22170 -22171  1060 -22173 0
 22169  22170 -22171  1060 -22174 0

c  0-1 --> -1
c    (-b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧ -p_1060) -> ( b^{212, 6}_2 ∧ -b^{212, 6}_1 ∧  b^{212, 6}_0)
c  in CNF:
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨  b^{212, 6}_2
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_1
c     b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨  b^{212, 6}_0
c  in DIMACS:
 22169  22170  22171  1060  22172 0
 22169  22170  22171  1060 -22173 0
 22169  22170  22171  1060  22174 0

c  -1-1 --> -2
c    ( b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧  b^{212, 5}_0 ∧ -p_1060) -> ( b^{212, 6}_2 ∧  b^{212, 6}_1 ∧ -b^{212, 6}_0)
c  in CNF:
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨  b^{212, 6}_2
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨  b^{212, 6}_1
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨  p_1060 ∨ -b^{212, 6}_0
c  in DIMACS:
-22169  22170 -22171  1060  22172 0
-22169  22170 -22171  1060  22173 0
-22169  22170 -22171  1060 -22174 0

c  -2-1 --> break 
c    ( b^{212, 5}_2 ∧  b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨  b^{212, 5}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-22169 -22170  22171  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{212, 5}_2 ∧ -b^{212, 5}_1 ∧ -b^{212, 5}_0 ∧ true) 
c  in CNF:
c    -b^{212, 5}_2 ∨  b^{212, 5}_1 ∨  b^{212, 5}_0 ∨ false 
c  in DIMACS:
-22169  22170  22171  0

c  3 does not represent an automaton state.
c    -(-b^{212, 5}_2 ∧  b^{212, 5}_1 ∧  b^{212, 5}_0 ∧ true) 
c  in CNF:
c     b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ false 
c  in DIMACS:
 22169 -22170 -22171  0
c  -3 does not represent an automaton state.
c    -( b^{212, 5}_2 ∧  b^{212, 5}_1 ∧  b^{212, 5}_0 ∧ true) 
c  in CNF:
c    -b^{212, 5}_2 ∨ -b^{212, 5}_1 ∨ -b^{212, 5}_0 ∨ false 
c  in DIMACS:
-22169 -22170 -22171  0

c INIT for k = 213
c    -b^{213, 1}_2
c    -b^{213, 1}_1
c    -b^{213, 1}_0
c  in DIMACS:
-22175 0
-22176 0
-22177 0

c Transitions for k = 213
c i = 1
c  -2+1 --> -1
c    ( b^{213, 1}_2 ∧  b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧  p_213) -> ( b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0)
c  in CNF:
c    -b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨  b^{213, 2}_2
c    -b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_1
c    -b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨  b^{213, 2}_0
c  in DIMACS:
-22175 -22176  22177 -213  22178 0
-22175 -22176  22177 -213 -22179 0
-22175 -22176  22177 -213  22180 0

c  -1+1 --> 0
c    ( b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧  b^{213, 1}_0 ∧  p_213) -> (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧ -b^{213, 2}_0)
c  in CNF:
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_2
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_1
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_0
c  in DIMACS:
-22175  22176 -22177 -213 -22178 0
-22175  22176 -22177 -213 -22179 0
-22175  22176 -22177 -213 -22180 0

c  0+1 --> 1
c    (-b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧  p_213) -> (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0)
c  in CNF:
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_2
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_1
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨  b^{213, 2}_0
c  in DIMACS:
 22175  22176  22177 -213 -22178 0
 22175  22176  22177 -213 -22179 0
 22175  22176  22177 -213  22180 0

c  1+1 --> 2
c    (-b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧  b^{213, 1}_0 ∧  p_213) -> (-b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0)
c  in CNF:
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_2
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨  b^{213, 2}_1
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ -p_213 ∨ -b^{213, 2}_0
c  in DIMACS:
 22175  22176 -22177 -213 -22178 0
 22175  22176 -22177 -213  22179 0
 22175  22176 -22177 -213 -22180 0

c  2+1 --> break 
c    (-b^{213, 1}_2 ∧  b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧  p_213) -> break
c  in CNF:
c     b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ -p_213 ∨ break
c  in DIMACS:
 22175 -22176  22177 -213 1162 0


c  2-1 --> 1
c    (-b^{213, 1}_2 ∧  b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧ -p_213) -> (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0)
c  in CNF:
c     b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_2
c     b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_1
c     b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨  b^{213, 2}_0
c  in DIMACS:
 22175 -22176  22177  213 -22178 0
 22175 -22176  22177  213 -22179 0
 22175 -22176  22177  213  22180 0

c  1-1 --> 0
c    (-b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧  b^{213, 1}_0 ∧ -p_213) -> (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧ -b^{213, 2}_0)
c  in CNF:
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_2
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_1
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_0
c  in DIMACS:
 22175  22176 -22177  213 -22178 0
 22175  22176 -22177  213 -22179 0
 22175  22176 -22177  213 -22180 0

c  0-1 --> -1
c    (-b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧ -p_213) -> ( b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0)
c  in CNF:
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨  b^{213, 2}_2
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_1
c     b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨  b^{213, 2}_0
c  in DIMACS:
 22175  22176  22177  213  22178 0
 22175  22176  22177  213 -22179 0
 22175  22176  22177  213  22180 0

c  -1-1 --> -2
c    ( b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧  b^{213, 1}_0 ∧ -p_213) -> ( b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0)
c  in CNF:
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨  b^{213, 2}_2
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨  b^{213, 2}_1
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨  p_213 ∨ -b^{213, 2}_0
c  in DIMACS:
-22175  22176 -22177  213  22178 0
-22175  22176 -22177  213  22179 0
-22175  22176 -22177  213 -22180 0

c  -2-1 --> break 
c    ( b^{213, 1}_2 ∧  b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧ -p_213) -> break
c  in CNF:
c    -b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨  b^{213, 1}_0 ∨  p_213 ∨ break
c  in DIMACS:
-22175 -22176  22177  213 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{213, 1}_2 ∧ -b^{213, 1}_1 ∧ -b^{213, 1}_0 ∧ true) 
c  in CNF:
c    -b^{213, 1}_2 ∨  b^{213, 1}_1 ∨  b^{213, 1}_0 ∨ false 
c  in DIMACS:
-22175  22176  22177  0

c  3 does not represent an automaton state.
c    -(-b^{213, 1}_2 ∧  b^{213, 1}_1 ∧  b^{213, 1}_0 ∧ true) 
c  in CNF:
c     b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ false 
c  in DIMACS:
 22175 -22176 -22177  0
c  -3 does not represent an automaton state.
c    -( b^{213, 1}_2 ∧  b^{213, 1}_1 ∧  b^{213, 1}_0 ∧ true) 
c  in CNF:
c    -b^{213, 1}_2 ∨ -b^{213, 1}_1 ∨ -b^{213, 1}_0 ∨ false 
c  in DIMACS:
-22175 -22176 -22177  0

c i = 2
c  -2+1 --> -1
c    ( b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧  p_426) -> ( b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0)
c  in CNF:
c    -b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨  b^{213, 3}_2
c    -b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_1
c    -b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨  b^{213, 3}_0
c  in DIMACS:
-22178 -22179  22180 -426  22181 0
-22178 -22179  22180 -426 -22182 0
-22178 -22179  22180 -426  22183 0

c  -1+1 --> 0
c    ( b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0 ∧  p_426) -> (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧ -b^{213, 3}_0)
c  in CNF:
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_2
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_1
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_0
c  in DIMACS:
-22178  22179 -22180 -426 -22181 0
-22178  22179 -22180 -426 -22182 0
-22178  22179 -22180 -426 -22183 0

c  0+1 --> 1
c    (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧  p_426) -> (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0)
c  in CNF:
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_2
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_1
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨  b^{213, 3}_0
c  in DIMACS:
 22178  22179  22180 -426 -22181 0
 22178  22179  22180 -426 -22182 0
 22178  22179  22180 -426  22183 0

c  1+1 --> 2
c    (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0 ∧  p_426) -> (-b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0)
c  in CNF:
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_2
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨  b^{213, 3}_1
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ -p_426 ∨ -b^{213, 3}_0
c  in DIMACS:
 22178  22179 -22180 -426 -22181 0
 22178  22179 -22180 -426  22182 0
 22178  22179 -22180 -426 -22183 0

c  2+1 --> break 
c    (-b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧  p_426) -> break
c  in CNF:
c     b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ -p_426 ∨ break
c  in DIMACS:
 22178 -22179  22180 -426 1162 0


c  2-1 --> 1
c    (-b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧ -p_426) -> (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0)
c  in CNF:
c     b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_2
c     b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_1
c     b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨  b^{213, 3}_0
c  in DIMACS:
 22178 -22179  22180  426 -22181 0
 22178 -22179  22180  426 -22182 0
 22178 -22179  22180  426  22183 0

c  1-1 --> 0
c    (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0 ∧ -p_426) -> (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧ -b^{213, 3}_0)
c  in CNF:
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_2
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_1
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_0
c  in DIMACS:
 22178  22179 -22180  426 -22181 0
 22178  22179 -22180  426 -22182 0
 22178  22179 -22180  426 -22183 0

c  0-1 --> -1
c    (-b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧ -p_426) -> ( b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0)
c  in CNF:
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨  b^{213, 3}_2
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_1
c     b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨  b^{213, 3}_0
c  in DIMACS:
 22178  22179  22180  426  22181 0
 22178  22179  22180  426 -22182 0
 22178  22179  22180  426  22183 0

c  -1-1 --> -2
c    ( b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧  b^{213, 2}_0 ∧ -p_426) -> ( b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0)
c  in CNF:
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨  b^{213, 3}_2
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨  b^{213, 3}_1
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨  p_426 ∨ -b^{213, 3}_0
c  in DIMACS:
-22178  22179 -22180  426  22181 0
-22178  22179 -22180  426  22182 0
-22178  22179 -22180  426 -22183 0

c  -2-1 --> break 
c    ( b^{213, 2}_2 ∧  b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧ -p_426) -> break
c  in CNF:
c    -b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨  b^{213, 2}_0 ∨  p_426 ∨ break
c  in DIMACS:
-22178 -22179  22180  426 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{213, 2}_2 ∧ -b^{213, 2}_1 ∧ -b^{213, 2}_0 ∧ true) 
c  in CNF:
c    -b^{213, 2}_2 ∨  b^{213, 2}_1 ∨  b^{213, 2}_0 ∨ false 
c  in DIMACS:
-22178  22179  22180  0

c  3 does not represent an automaton state.
c    -(-b^{213, 2}_2 ∧  b^{213, 2}_1 ∧  b^{213, 2}_0 ∧ true) 
c  in CNF:
c     b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ false 
c  in DIMACS:
 22178 -22179 -22180  0
c  -3 does not represent an automaton state.
c    -( b^{213, 2}_2 ∧  b^{213, 2}_1 ∧  b^{213, 2}_0 ∧ true) 
c  in CNF:
c    -b^{213, 2}_2 ∨ -b^{213, 2}_1 ∨ -b^{213, 2}_0 ∨ false 
c  in DIMACS:
-22178 -22179 -22180  0

c i = 3
c  -2+1 --> -1
c    ( b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧  p_639) -> ( b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0)
c  in CNF:
c    -b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨  b^{213, 4}_2
c    -b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_1
c    -b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨  b^{213, 4}_0
c  in DIMACS:
-22181 -22182  22183 -639  22184 0
-22181 -22182  22183 -639 -22185 0
-22181 -22182  22183 -639  22186 0

c  -1+1 --> 0
c    ( b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0 ∧  p_639) -> (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧ -b^{213, 4}_0)
c  in CNF:
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_2
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_1
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_0
c  in DIMACS:
-22181  22182 -22183 -639 -22184 0
-22181  22182 -22183 -639 -22185 0
-22181  22182 -22183 -639 -22186 0

c  0+1 --> 1
c    (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧  p_639) -> (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0)
c  in CNF:
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_2
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_1
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨  b^{213, 4}_0
c  in DIMACS:
 22181  22182  22183 -639 -22184 0
 22181  22182  22183 -639 -22185 0
 22181  22182  22183 -639  22186 0

c  1+1 --> 2
c    (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0 ∧  p_639) -> (-b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0)
c  in CNF:
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_2
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨  b^{213, 4}_1
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ -p_639 ∨ -b^{213, 4}_0
c  in DIMACS:
 22181  22182 -22183 -639 -22184 0
 22181  22182 -22183 -639  22185 0
 22181  22182 -22183 -639 -22186 0

c  2+1 --> break 
c    (-b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧  p_639) -> break
c  in CNF:
c     b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ -p_639 ∨ break
c  in DIMACS:
 22181 -22182  22183 -639 1162 0


c  2-1 --> 1
c    (-b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧ -p_639) -> (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0)
c  in CNF:
c     b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_2
c     b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_1
c     b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨  b^{213, 4}_0
c  in DIMACS:
 22181 -22182  22183  639 -22184 0
 22181 -22182  22183  639 -22185 0
 22181 -22182  22183  639  22186 0

c  1-1 --> 0
c    (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0 ∧ -p_639) -> (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧ -b^{213, 4}_0)
c  in CNF:
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_2
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_1
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_0
c  in DIMACS:
 22181  22182 -22183  639 -22184 0
 22181  22182 -22183  639 -22185 0
 22181  22182 -22183  639 -22186 0

c  0-1 --> -1
c    (-b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧ -p_639) -> ( b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0)
c  in CNF:
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨  b^{213, 4}_2
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_1
c     b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨  b^{213, 4}_0
c  in DIMACS:
 22181  22182  22183  639  22184 0
 22181  22182  22183  639 -22185 0
 22181  22182  22183  639  22186 0

c  -1-1 --> -2
c    ( b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧  b^{213, 3}_0 ∧ -p_639) -> ( b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0)
c  in CNF:
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨  b^{213, 4}_2
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨  b^{213, 4}_1
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨  p_639 ∨ -b^{213, 4}_0
c  in DIMACS:
-22181  22182 -22183  639  22184 0
-22181  22182 -22183  639  22185 0
-22181  22182 -22183  639 -22186 0

c  -2-1 --> break 
c    ( b^{213, 3}_2 ∧  b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧ -p_639) -> break
c  in CNF:
c    -b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨  b^{213, 3}_0 ∨  p_639 ∨ break
c  in DIMACS:
-22181 -22182  22183  639 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{213, 3}_2 ∧ -b^{213, 3}_1 ∧ -b^{213, 3}_0 ∧ true) 
c  in CNF:
c    -b^{213, 3}_2 ∨  b^{213, 3}_1 ∨  b^{213, 3}_0 ∨ false 
c  in DIMACS:
-22181  22182  22183  0

c  3 does not represent an automaton state.
c    -(-b^{213, 3}_2 ∧  b^{213, 3}_1 ∧  b^{213, 3}_0 ∧ true) 
c  in CNF:
c     b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ false 
c  in DIMACS:
 22181 -22182 -22183  0
c  -3 does not represent an automaton state.
c    -( b^{213, 3}_2 ∧  b^{213, 3}_1 ∧  b^{213, 3}_0 ∧ true) 
c  in CNF:
c    -b^{213, 3}_2 ∨ -b^{213, 3}_1 ∨ -b^{213, 3}_0 ∨ false 
c  in DIMACS:
-22181 -22182 -22183  0

c i = 4
c  -2+1 --> -1
c    ( b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧  p_852) -> ( b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0)
c  in CNF:
c    -b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨  b^{213, 5}_2
c    -b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_1
c    -b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨  b^{213, 5}_0
c  in DIMACS:
-22184 -22185  22186 -852  22187 0
-22184 -22185  22186 -852 -22188 0
-22184 -22185  22186 -852  22189 0

c  -1+1 --> 0
c    ( b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0 ∧  p_852) -> (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧ -b^{213, 5}_0)
c  in CNF:
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_2
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_1
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_0
c  in DIMACS:
-22184  22185 -22186 -852 -22187 0
-22184  22185 -22186 -852 -22188 0
-22184  22185 -22186 -852 -22189 0

c  0+1 --> 1
c    (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧  p_852) -> (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0)
c  in CNF:
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_2
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_1
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨  b^{213, 5}_0
c  in DIMACS:
 22184  22185  22186 -852 -22187 0
 22184  22185  22186 -852 -22188 0
 22184  22185  22186 -852  22189 0

c  1+1 --> 2
c    (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0 ∧  p_852) -> (-b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0)
c  in CNF:
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_2
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨  b^{213, 5}_1
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ -p_852 ∨ -b^{213, 5}_0
c  in DIMACS:
 22184  22185 -22186 -852 -22187 0
 22184  22185 -22186 -852  22188 0
 22184  22185 -22186 -852 -22189 0

c  2+1 --> break 
c    (-b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧  p_852) -> break
c  in CNF:
c     b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 22184 -22185  22186 -852 1162 0


c  2-1 --> 1
c    (-b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧ -p_852) -> (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0)
c  in CNF:
c     b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_2
c     b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_1
c     b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨  b^{213, 5}_0
c  in DIMACS:
 22184 -22185  22186  852 -22187 0
 22184 -22185  22186  852 -22188 0
 22184 -22185  22186  852  22189 0

c  1-1 --> 0
c    (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0 ∧ -p_852) -> (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧ -b^{213, 5}_0)
c  in CNF:
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_2
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_1
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_0
c  in DIMACS:
 22184  22185 -22186  852 -22187 0
 22184  22185 -22186  852 -22188 0
 22184  22185 -22186  852 -22189 0

c  0-1 --> -1
c    (-b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧ -p_852) -> ( b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0)
c  in CNF:
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨  b^{213, 5}_2
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_1
c     b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨  b^{213, 5}_0
c  in DIMACS:
 22184  22185  22186  852  22187 0
 22184  22185  22186  852 -22188 0
 22184  22185  22186  852  22189 0

c  -1-1 --> -2
c    ( b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧  b^{213, 4}_0 ∧ -p_852) -> ( b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0)
c  in CNF:
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨  b^{213, 5}_2
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨  b^{213, 5}_1
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨  p_852 ∨ -b^{213, 5}_0
c  in DIMACS:
-22184  22185 -22186  852  22187 0
-22184  22185 -22186  852  22188 0
-22184  22185 -22186  852 -22189 0

c  -2-1 --> break 
c    ( b^{213, 4}_2 ∧  b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨  b^{213, 4}_0 ∨  p_852 ∨ break
c  in DIMACS:
-22184 -22185  22186  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{213, 4}_2 ∧ -b^{213, 4}_1 ∧ -b^{213, 4}_0 ∧ true) 
c  in CNF:
c    -b^{213, 4}_2 ∨  b^{213, 4}_1 ∨  b^{213, 4}_0 ∨ false 
c  in DIMACS:
-22184  22185  22186  0

c  3 does not represent an automaton state.
c    -(-b^{213, 4}_2 ∧  b^{213, 4}_1 ∧  b^{213, 4}_0 ∧ true) 
c  in CNF:
c     b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ false 
c  in DIMACS:
 22184 -22185 -22186  0
c  -3 does not represent an automaton state.
c    -( b^{213, 4}_2 ∧  b^{213, 4}_1 ∧  b^{213, 4}_0 ∧ true) 
c  in CNF:
c    -b^{213, 4}_2 ∨ -b^{213, 4}_1 ∨ -b^{213, 4}_0 ∨ false 
c  in DIMACS:
-22184 -22185 -22186  0

c i = 5
c  -2+1 --> -1
c    ( b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧  p_1065) -> ( b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧  b^{213, 6}_0)
c  in CNF:
c    -b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨  b^{213, 6}_2
c    -b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_1
c    -b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨  b^{213, 6}_0
c  in DIMACS:
-22187 -22188  22189 -1065  22190 0
-22187 -22188  22189 -1065 -22191 0
-22187 -22188  22189 -1065  22192 0

c  -1+1 --> 0
c    ( b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0 ∧  p_1065) -> (-b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧ -b^{213, 6}_0)
c  in CNF:
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_2
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_1
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_0
c  in DIMACS:
-22187  22188 -22189 -1065 -22190 0
-22187  22188 -22189 -1065 -22191 0
-22187  22188 -22189 -1065 -22192 0

c  0+1 --> 1
c    (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧  p_1065) -> (-b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧  b^{213, 6}_0)
c  in CNF:
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_2
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_1
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨  b^{213, 6}_0
c  in DIMACS:
 22187  22188  22189 -1065 -22190 0
 22187  22188  22189 -1065 -22191 0
 22187  22188  22189 -1065  22192 0

c  1+1 --> 2
c    (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0 ∧  p_1065) -> (-b^{213, 6}_2 ∧  b^{213, 6}_1 ∧ -b^{213, 6}_0)
c  in CNF:
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_2
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨  b^{213, 6}_1
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ -p_1065 ∨ -b^{213, 6}_0
c  in DIMACS:
 22187  22188 -22189 -1065 -22190 0
 22187  22188 -22189 -1065  22191 0
 22187  22188 -22189 -1065 -22192 0

c  2+1 --> break 
c    (-b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 22187 -22188  22189 -1065 1162 0


c  2-1 --> 1
c    (-b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧ -p_1065) -> (-b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧  b^{213, 6}_0)
c  in CNF:
c     b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_2
c     b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_1
c     b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨  b^{213, 6}_0
c  in DIMACS:
 22187 -22188  22189  1065 -22190 0
 22187 -22188  22189  1065 -22191 0
 22187 -22188  22189  1065  22192 0

c  1-1 --> 0
c    (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0 ∧ -p_1065) -> (-b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧ -b^{213, 6}_0)
c  in CNF:
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_2
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_1
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_0
c  in DIMACS:
 22187  22188 -22189  1065 -22190 0
 22187  22188 -22189  1065 -22191 0
 22187  22188 -22189  1065 -22192 0

c  0-1 --> -1
c    (-b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧ -p_1065) -> ( b^{213, 6}_2 ∧ -b^{213, 6}_1 ∧  b^{213, 6}_0)
c  in CNF:
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨  b^{213, 6}_2
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_1
c     b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨  b^{213, 6}_0
c  in DIMACS:
 22187  22188  22189  1065  22190 0
 22187  22188  22189  1065 -22191 0
 22187  22188  22189  1065  22192 0

c  -1-1 --> -2
c    ( b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧  b^{213, 5}_0 ∧ -p_1065) -> ( b^{213, 6}_2 ∧  b^{213, 6}_1 ∧ -b^{213, 6}_0)
c  in CNF:
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨  b^{213, 6}_2
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨  b^{213, 6}_1
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨  p_1065 ∨ -b^{213, 6}_0
c  in DIMACS:
-22187  22188 -22189  1065  22190 0
-22187  22188 -22189  1065  22191 0
-22187  22188 -22189  1065 -22192 0

c  -2-1 --> break 
c    ( b^{213, 5}_2 ∧  b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨  b^{213, 5}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-22187 -22188  22189  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{213, 5}_2 ∧ -b^{213, 5}_1 ∧ -b^{213, 5}_0 ∧ true) 
c  in CNF:
c    -b^{213, 5}_2 ∨  b^{213, 5}_1 ∨  b^{213, 5}_0 ∨ false 
c  in DIMACS:
-22187  22188  22189  0

c  3 does not represent an automaton state.
c    -(-b^{213, 5}_2 ∧  b^{213, 5}_1 ∧  b^{213, 5}_0 ∧ true) 
c  in CNF:
c     b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ false 
c  in DIMACS:
 22187 -22188 -22189  0
c  -3 does not represent an automaton state.
c    -( b^{213, 5}_2 ∧  b^{213, 5}_1 ∧  b^{213, 5}_0 ∧ true) 
c  in CNF:
c    -b^{213, 5}_2 ∨ -b^{213, 5}_1 ∨ -b^{213, 5}_0 ∨ false 
c  in DIMACS:
-22187 -22188 -22189  0

c INIT for k = 214
c    -b^{214, 1}_2
c    -b^{214, 1}_1
c    -b^{214, 1}_0
c  in DIMACS:
-22193 0
-22194 0
-22195 0

c Transitions for k = 214
c i = 1
c  -2+1 --> -1
c    ( b^{214, 1}_2 ∧  b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧  p_214) -> ( b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0)
c  in CNF:
c    -b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨  b^{214, 2}_2
c    -b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_1
c    -b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨  b^{214, 2}_0
c  in DIMACS:
-22193 -22194  22195 -214  22196 0
-22193 -22194  22195 -214 -22197 0
-22193 -22194  22195 -214  22198 0

c  -1+1 --> 0
c    ( b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧  b^{214, 1}_0 ∧  p_214) -> (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧ -b^{214, 2}_0)
c  in CNF:
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_2
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_1
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_0
c  in DIMACS:
-22193  22194 -22195 -214 -22196 0
-22193  22194 -22195 -214 -22197 0
-22193  22194 -22195 -214 -22198 0

c  0+1 --> 1
c    (-b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧  p_214) -> (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0)
c  in CNF:
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_2
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_1
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨  b^{214, 2}_0
c  in DIMACS:
 22193  22194  22195 -214 -22196 0
 22193  22194  22195 -214 -22197 0
 22193  22194  22195 -214  22198 0

c  1+1 --> 2
c    (-b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧  b^{214, 1}_0 ∧  p_214) -> (-b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0)
c  in CNF:
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_2
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨  b^{214, 2}_1
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ -p_214 ∨ -b^{214, 2}_0
c  in DIMACS:
 22193  22194 -22195 -214 -22196 0
 22193  22194 -22195 -214  22197 0
 22193  22194 -22195 -214 -22198 0

c  2+1 --> break 
c    (-b^{214, 1}_2 ∧  b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧  p_214) -> break
c  in CNF:
c     b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ -p_214 ∨ break
c  in DIMACS:
 22193 -22194  22195 -214 1162 0


c  2-1 --> 1
c    (-b^{214, 1}_2 ∧  b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧ -p_214) -> (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0)
c  in CNF:
c     b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_2
c     b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_1
c     b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨  b^{214, 2}_0
c  in DIMACS:
 22193 -22194  22195  214 -22196 0
 22193 -22194  22195  214 -22197 0
 22193 -22194  22195  214  22198 0

c  1-1 --> 0
c    (-b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧  b^{214, 1}_0 ∧ -p_214) -> (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧ -b^{214, 2}_0)
c  in CNF:
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_2
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_1
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_0
c  in DIMACS:
 22193  22194 -22195  214 -22196 0
 22193  22194 -22195  214 -22197 0
 22193  22194 -22195  214 -22198 0

c  0-1 --> -1
c    (-b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧ -p_214) -> ( b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0)
c  in CNF:
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨  b^{214, 2}_2
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_1
c     b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨  b^{214, 2}_0
c  in DIMACS:
 22193  22194  22195  214  22196 0
 22193  22194  22195  214 -22197 0
 22193  22194  22195  214  22198 0

c  -1-1 --> -2
c    ( b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧  b^{214, 1}_0 ∧ -p_214) -> ( b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0)
c  in CNF:
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨  b^{214, 2}_2
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨  b^{214, 2}_1
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨  p_214 ∨ -b^{214, 2}_0
c  in DIMACS:
-22193  22194 -22195  214  22196 0
-22193  22194 -22195  214  22197 0
-22193  22194 -22195  214 -22198 0

c  -2-1 --> break 
c    ( b^{214, 1}_2 ∧  b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧ -p_214) -> break
c  in CNF:
c    -b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨  b^{214, 1}_0 ∨  p_214 ∨ break
c  in DIMACS:
-22193 -22194  22195  214 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{214, 1}_2 ∧ -b^{214, 1}_1 ∧ -b^{214, 1}_0 ∧ true) 
c  in CNF:
c    -b^{214, 1}_2 ∨  b^{214, 1}_1 ∨  b^{214, 1}_0 ∨ false 
c  in DIMACS:
-22193  22194  22195  0

c  3 does not represent an automaton state.
c    -(-b^{214, 1}_2 ∧  b^{214, 1}_1 ∧  b^{214, 1}_0 ∧ true) 
c  in CNF:
c     b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ false 
c  in DIMACS:
 22193 -22194 -22195  0
c  -3 does not represent an automaton state.
c    -( b^{214, 1}_2 ∧  b^{214, 1}_1 ∧  b^{214, 1}_0 ∧ true) 
c  in CNF:
c    -b^{214, 1}_2 ∨ -b^{214, 1}_1 ∨ -b^{214, 1}_0 ∨ false 
c  in DIMACS:
-22193 -22194 -22195  0

c i = 2
c  -2+1 --> -1
c    ( b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧  p_428) -> ( b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0)
c  in CNF:
c    -b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨  b^{214, 3}_2
c    -b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_1
c    -b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨  b^{214, 3}_0
c  in DIMACS:
-22196 -22197  22198 -428  22199 0
-22196 -22197  22198 -428 -22200 0
-22196 -22197  22198 -428  22201 0

c  -1+1 --> 0
c    ( b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0 ∧  p_428) -> (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧ -b^{214, 3}_0)
c  in CNF:
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_2
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_1
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_0
c  in DIMACS:
-22196  22197 -22198 -428 -22199 0
-22196  22197 -22198 -428 -22200 0
-22196  22197 -22198 -428 -22201 0

c  0+1 --> 1
c    (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧  p_428) -> (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0)
c  in CNF:
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_2
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_1
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨  b^{214, 3}_0
c  in DIMACS:
 22196  22197  22198 -428 -22199 0
 22196  22197  22198 -428 -22200 0
 22196  22197  22198 -428  22201 0

c  1+1 --> 2
c    (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0 ∧  p_428) -> (-b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0)
c  in CNF:
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_2
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨  b^{214, 3}_1
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ -p_428 ∨ -b^{214, 3}_0
c  in DIMACS:
 22196  22197 -22198 -428 -22199 0
 22196  22197 -22198 -428  22200 0
 22196  22197 -22198 -428 -22201 0

c  2+1 --> break 
c    (-b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧  p_428) -> break
c  in CNF:
c     b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ -p_428 ∨ break
c  in DIMACS:
 22196 -22197  22198 -428 1162 0


c  2-1 --> 1
c    (-b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧ -p_428) -> (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0)
c  in CNF:
c     b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_2
c     b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_1
c     b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨  b^{214, 3}_0
c  in DIMACS:
 22196 -22197  22198  428 -22199 0
 22196 -22197  22198  428 -22200 0
 22196 -22197  22198  428  22201 0

c  1-1 --> 0
c    (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0 ∧ -p_428) -> (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧ -b^{214, 3}_0)
c  in CNF:
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_2
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_1
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_0
c  in DIMACS:
 22196  22197 -22198  428 -22199 0
 22196  22197 -22198  428 -22200 0
 22196  22197 -22198  428 -22201 0

c  0-1 --> -1
c    (-b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧ -p_428) -> ( b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0)
c  in CNF:
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨  b^{214, 3}_2
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_1
c     b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨  b^{214, 3}_0
c  in DIMACS:
 22196  22197  22198  428  22199 0
 22196  22197  22198  428 -22200 0
 22196  22197  22198  428  22201 0

c  -1-1 --> -2
c    ( b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧  b^{214, 2}_0 ∧ -p_428) -> ( b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0)
c  in CNF:
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨  b^{214, 3}_2
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨  b^{214, 3}_1
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨  p_428 ∨ -b^{214, 3}_0
c  in DIMACS:
-22196  22197 -22198  428  22199 0
-22196  22197 -22198  428  22200 0
-22196  22197 -22198  428 -22201 0

c  -2-1 --> break 
c    ( b^{214, 2}_2 ∧  b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧ -p_428) -> break
c  in CNF:
c    -b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨  b^{214, 2}_0 ∨  p_428 ∨ break
c  in DIMACS:
-22196 -22197  22198  428 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{214, 2}_2 ∧ -b^{214, 2}_1 ∧ -b^{214, 2}_0 ∧ true) 
c  in CNF:
c    -b^{214, 2}_2 ∨  b^{214, 2}_1 ∨  b^{214, 2}_0 ∨ false 
c  in DIMACS:
-22196  22197  22198  0

c  3 does not represent an automaton state.
c    -(-b^{214, 2}_2 ∧  b^{214, 2}_1 ∧  b^{214, 2}_0 ∧ true) 
c  in CNF:
c     b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ false 
c  in DIMACS:
 22196 -22197 -22198  0
c  -3 does not represent an automaton state.
c    -( b^{214, 2}_2 ∧  b^{214, 2}_1 ∧  b^{214, 2}_0 ∧ true) 
c  in CNF:
c    -b^{214, 2}_2 ∨ -b^{214, 2}_1 ∨ -b^{214, 2}_0 ∨ false 
c  in DIMACS:
-22196 -22197 -22198  0

c i = 3
c  -2+1 --> -1
c    ( b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧  p_642) -> ( b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0)
c  in CNF:
c    -b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨  b^{214, 4}_2
c    -b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_1
c    -b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨  b^{214, 4}_0
c  in DIMACS:
-22199 -22200  22201 -642  22202 0
-22199 -22200  22201 -642 -22203 0
-22199 -22200  22201 -642  22204 0

c  -1+1 --> 0
c    ( b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0 ∧  p_642) -> (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧ -b^{214, 4}_0)
c  in CNF:
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_2
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_1
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_0
c  in DIMACS:
-22199  22200 -22201 -642 -22202 0
-22199  22200 -22201 -642 -22203 0
-22199  22200 -22201 -642 -22204 0

c  0+1 --> 1
c    (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧  p_642) -> (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0)
c  in CNF:
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_2
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_1
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨  b^{214, 4}_0
c  in DIMACS:
 22199  22200  22201 -642 -22202 0
 22199  22200  22201 -642 -22203 0
 22199  22200  22201 -642  22204 0

c  1+1 --> 2
c    (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0 ∧  p_642) -> (-b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0)
c  in CNF:
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_2
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨  b^{214, 4}_1
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ -p_642 ∨ -b^{214, 4}_0
c  in DIMACS:
 22199  22200 -22201 -642 -22202 0
 22199  22200 -22201 -642  22203 0
 22199  22200 -22201 -642 -22204 0

c  2+1 --> break 
c    (-b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧  p_642) -> break
c  in CNF:
c     b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 22199 -22200  22201 -642 1162 0


c  2-1 --> 1
c    (-b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧ -p_642) -> (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0)
c  in CNF:
c     b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_2
c     b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_1
c     b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨  b^{214, 4}_0
c  in DIMACS:
 22199 -22200  22201  642 -22202 0
 22199 -22200  22201  642 -22203 0
 22199 -22200  22201  642  22204 0

c  1-1 --> 0
c    (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0 ∧ -p_642) -> (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧ -b^{214, 4}_0)
c  in CNF:
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_2
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_1
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_0
c  in DIMACS:
 22199  22200 -22201  642 -22202 0
 22199  22200 -22201  642 -22203 0
 22199  22200 -22201  642 -22204 0

c  0-1 --> -1
c    (-b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧ -p_642) -> ( b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0)
c  in CNF:
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨  b^{214, 4}_2
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_1
c     b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨  b^{214, 4}_0
c  in DIMACS:
 22199  22200  22201  642  22202 0
 22199  22200  22201  642 -22203 0
 22199  22200  22201  642  22204 0

c  -1-1 --> -2
c    ( b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧  b^{214, 3}_0 ∧ -p_642) -> ( b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0)
c  in CNF:
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨  b^{214, 4}_2
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨  b^{214, 4}_1
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨  p_642 ∨ -b^{214, 4}_0
c  in DIMACS:
-22199  22200 -22201  642  22202 0
-22199  22200 -22201  642  22203 0
-22199  22200 -22201  642 -22204 0

c  -2-1 --> break 
c    ( b^{214, 3}_2 ∧  b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨  b^{214, 3}_0 ∨  p_642 ∨ break
c  in DIMACS:
-22199 -22200  22201  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{214, 3}_2 ∧ -b^{214, 3}_1 ∧ -b^{214, 3}_0 ∧ true) 
c  in CNF:
c    -b^{214, 3}_2 ∨  b^{214, 3}_1 ∨  b^{214, 3}_0 ∨ false 
c  in DIMACS:
-22199  22200  22201  0

c  3 does not represent an automaton state.
c    -(-b^{214, 3}_2 ∧  b^{214, 3}_1 ∧  b^{214, 3}_0 ∧ true) 
c  in CNF:
c     b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ false 
c  in DIMACS:
 22199 -22200 -22201  0
c  -3 does not represent an automaton state.
c    -( b^{214, 3}_2 ∧  b^{214, 3}_1 ∧  b^{214, 3}_0 ∧ true) 
c  in CNF:
c    -b^{214, 3}_2 ∨ -b^{214, 3}_1 ∨ -b^{214, 3}_0 ∨ false 
c  in DIMACS:
-22199 -22200 -22201  0

c i = 4
c  -2+1 --> -1
c    ( b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧  p_856) -> ( b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0)
c  in CNF:
c    -b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨  b^{214, 5}_2
c    -b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_1
c    -b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨  b^{214, 5}_0
c  in DIMACS:
-22202 -22203  22204 -856  22205 0
-22202 -22203  22204 -856 -22206 0
-22202 -22203  22204 -856  22207 0

c  -1+1 --> 0
c    ( b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0 ∧  p_856) -> (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧ -b^{214, 5}_0)
c  in CNF:
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_2
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_1
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_0
c  in DIMACS:
-22202  22203 -22204 -856 -22205 0
-22202  22203 -22204 -856 -22206 0
-22202  22203 -22204 -856 -22207 0

c  0+1 --> 1
c    (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧  p_856) -> (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0)
c  in CNF:
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_2
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_1
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨  b^{214, 5}_0
c  in DIMACS:
 22202  22203  22204 -856 -22205 0
 22202  22203  22204 -856 -22206 0
 22202  22203  22204 -856  22207 0

c  1+1 --> 2
c    (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0 ∧  p_856) -> (-b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0)
c  in CNF:
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_2
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨  b^{214, 5}_1
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ -p_856 ∨ -b^{214, 5}_0
c  in DIMACS:
 22202  22203 -22204 -856 -22205 0
 22202  22203 -22204 -856  22206 0
 22202  22203 -22204 -856 -22207 0

c  2+1 --> break 
c    (-b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧  p_856) -> break
c  in CNF:
c     b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ -p_856 ∨ break
c  in DIMACS:
 22202 -22203  22204 -856 1162 0


c  2-1 --> 1
c    (-b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧ -p_856) -> (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0)
c  in CNF:
c     b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_2
c     b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_1
c     b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨  b^{214, 5}_0
c  in DIMACS:
 22202 -22203  22204  856 -22205 0
 22202 -22203  22204  856 -22206 0
 22202 -22203  22204  856  22207 0

c  1-1 --> 0
c    (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0 ∧ -p_856) -> (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧ -b^{214, 5}_0)
c  in CNF:
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_2
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_1
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_0
c  in DIMACS:
 22202  22203 -22204  856 -22205 0
 22202  22203 -22204  856 -22206 0
 22202  22203 -22204  856 -22207 0

c  0-1 --> -1
c    (-b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧ -p_856) -> ( b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0)
c  in CNF:
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨  b^{214, 5}_2
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_1
c     b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨  b^{214, 5}_0
c  in DIMACS:
 22202  22203  22204  856  22205 0
 22202  22203  22204  856 -22206 0
 22202  22203  22204  856  22207 0

c  -1-1 --> -2
c    ( b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧  b^{214, 4}_0 ∧ -p_856) -> ( b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0)
c  in CNF:
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨  b^{214, 5}_2
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨  b^{214, 5}_1
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨  p_856 ∨ -b^{214, 5}_0
c  in DIMACS:
-22202  22203 -22204  856  22205 0
-22202  22203 -22204  856  22206 0
-22202  22203 -22204  856 -22207 0

c  -2-1 --> break 
c    ( b^{214, 4}_2 ∧  b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧ -p_856) -> break
c  in CNF:
c    -b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨  b^{214, 4}_0 ∨  p_856 ∨ break
c  in DIMACS:
-22202 -22203  22204  856 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{214, 4}_2 ∧ -b^{214, 4}_1 ∧ -b^{214, 4}_0 ∧ true) 
c  in CNF:
c    -b^{214, 4}_2 ∨  b^{214, 4}_1 ∨  b^{214, 4}_0 ∨ false 
c  in DIMACS:
-22202  22203  22204  0

c  3 does not represent an automaton state.
c    -(-b^{214, 4}_2 ∧  b^{214, 4}_1 ∧  b^{214, 4}_0 ∧ true) 
c  in CNF:
c     b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ false 
c  in DIMACS:
 22202 -22203 -22204  0
c  -3 does not represent an automaton state.
c    -( b^{214, 4}_2 ∧  b^{214, 4}_1 ∧  b^{214, 4}_0 ∧ true) 
c  in CNF:
c    -b^{214, 4}_2 ∨ -b^{214, 4}_1 ∨ -b^{214, 4}_0 ∨ false 
c  in DIMACS:
-22202 -22203 -22204  0

c i = 5
c  -2+1 --> -1
c    ( b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧  p_1070) -> ( b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧  b^{214, 6}_0)
c  in CNF:
c    -b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨  b^{214, 6}_2
c    -b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_1
c    -b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨  b^{214, 6}_0
c  in DIMACS:
-22205 -22206  22207 -1070  22208 0
-22205 -22206  22207 -1070 -22209 0
-22205 -22206  22207 -1070  22210 0

c  -1+1 --> 0
c    ( b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0 ∧  p_1070) -> (-b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧ -b^{214, 6}_0)
c  in CNF:
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_2
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_1
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_0
c  in DIMACS:
-22205  22206 -22207 -1070 -22208 0
-22205  22206 -22207 -1070 -22209 0
-22205  22206 -22207 -1070 -22210 0

c  0+1 --> 1
c    (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧  p_1070) -> (-b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧  b^{214, 6}_0)
c  in CNF:
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_2
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_1
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨  b^{214, 6}_0
c  in DIMACS:
 22205  22206  22207 -1070 -22208 0
 22205  22206  22207 -1070 -22209 0
 22205  22206  22207 -1070  22210 0

c  1+1 --> 2
c    (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0 ∧  p_1070) -> (-b^{214, 6}_2 ∧  b^{214, 6}_1 ∧ -b^{214, 6}_0)
c  in CNF:
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_2
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨  b^{214, 6}_1
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ -p_1070 ∨ -b^{214, 6}_0
c  in DIMACS:
 22205  22206 -22207 -1070 -22208 0
 22205  22206 -22207 -1070  22209 0
 22205  22206 -22207 -1070 -22210 0

c  2+1 --> break 
c    (-b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧  p_1070) -> break
c  in CNF:
c     b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ -p_1070 ∨ break
c  in DIMACS:
 22205 -22206  22207 -1070 1162 0


c  2-1 --> 1
c    (-b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧ -p_1070) -> (-b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧  b^{214, 6}_0)
c  in CNF:
c     b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_2
c     b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_1
c     b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨  b^{214, 6}_0
c  in DIMACS:
 22205 -22206  22207  1070 -22208 0
 22205 -22206  22207  1070 -22209 0
 22205 -22206  22207  1070  22210 0

c  1-1 --> 0
c    (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0 ∧ -p_1070) -> (-b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧ -b^{214, 6}_0)
c  in CNF:
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_2
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_1
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_0
c  in DIMACS:
 22205  22206 -22207  1070 -22208 0
 22205  22206 -22207  1070 -22209 0
 22205  22206 -22207  1070 -22210 0

c  0-1 --> -1
c    (-b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧ -p_1070) -> ( b^{214, 6}_2 ∧ -b^{214, 6}_1 ∧  b^{214, 6}_0)
c  in CNF:
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨  b^{214, 6}_2
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_1
c     b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨  b^{214, 6}_0
c  in DIMACS:
 22205  22206  22207  1070  22208 0
 22205  22206  22207  1070 -22209 0
 22205  22206  22207  1070  22210 0

c  -1-1 --> -2
c    ( b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧  b^{214, 5}_0 ∧ -p_1070) -> ( b^{214, 6}_2 ∧  b^{214, 6}_1 ∧ -b^{214, 6}_0)
c  in CNF:
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨  b^{214, 6}_2
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨  b^{214, 6}_1
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨  p_1070 ∨ -b^{214, 6}_0
c  in DIMACS:
-22205  22206 -22207  1070  22208 0
-22205  22206 -22207  1070  22209 0
-22205  22206 -22207  1070 -22210 0

c  -2-1 --> break 
c    ( b^{214, 5}_2 ∧  b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧ -p_1070) -> break
c  in CNF:
c    -b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨  b^{214, 5}_0 ∨  p_1070 ∨ break
c  in DIMACS:
-22205 -22206  22207  1070 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{214, 5}_2 ∧ -b^{214, 5}_1 ∧ -b^{214, 5}_0 ∧ true) 
c  in CNF:
c    -b^{214, 5}_2 ∨  b^{214, 5}_1 ∨  b^{214, 5}_0 ∨ false 
c  in DIMACS:
-22205  22206  22207  0

c  3 does not represent an automaton state.
c    -(-b^{214, 5}_2 ∧  b^{214, 5}_1 ∧  b^{214, 5}_0 ∧ true) 
c  in CNF:
c     b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ false 
c  in DIMACS:
 22205 -22206 -22207  0
c  -3 does not represent an automaton state.
c    -( b^{214, 5}_2 ∧  b^{214, 5}_1 ∧  b^{214, 5}_0 ∧ true) 
c  in CNF:
c    -b^{214, 5}_2 ∨ -b^{214, 5}_1 ∨ -b^{214, 5}_0 ∨ false 
c  in DIMACS:
-22205 -22206 -22207  0

c INIT for k = 215
c    -b^{215, 1}_2
c    -b^{215, 1}_1
c    -b^{215, 1}_0
c  in DIMACS:
-22211 0
-22212 0
-22213 0

c Transitions for k = 215
c i = 1
c  -2+1 --> -1
c    ( b^{215, 1}_2 ∧  b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧  p_215) -> ( b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0)
c  in CNF:
c    -b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨  b^{215, 2}_2
c    -b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_1
c    -b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨  b^{215, 2}_0
c  in DIMACS:
-22211 -22212  22213 -215  22214 0
-22211 -22212  22213 -215 -22215 0
-22211 -22212  22213 -215  22216 0

c  -1+1 --> 0
c    ( b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧  b^{215, 1}_0 ∧  p_215) -> (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧ -b^{215, 2}_0)
c  in CNF:
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_2
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_1
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_0
c  in DIMACS:
-22211  22212 -22213 -215 -22214 0
-22211  22212 -22213 -215 -22215 0
-22211  22212 -22213 -215 -22216 0

c  0+1 --> 1
c    (-b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧  p_215) -> (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0)
c  in CNF:
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_2
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_1
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨  b^{215, 2}_0
c  in DIMACS:
 22211  22212  22213 -215 -22214 0
 22211  22212  22213 -215 -22215 0
 22211  22212  22213 -215  22216 0

c  1+1 --> 2
c    (-b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧  b^{215, 1}_0 ∧  p_215) -> (-b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0)
c  in CNF:
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_2
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨  b^{215, 2}_1
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ -p_215 ∨ -b^{215, 2}_0
c  in DIMACS:
 22211  22212 -22213 -215 -22214 0
 22211  22212 -22213 -215  22215 0
 22211  22212 -22213 -215 -22216 0

c  2+1 --> break 
c    (-b^{215, 1}_2 ∧  b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧  p_215) -> break
c  in CNF:
c     b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ -p_215 ∨ break
c  in DIMACS:
 22211 -22212  22213 -215 1162 0


c  2-1 --> 1
c    (-b^{215, 1}_2 ∧  b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧ -p_215) -> (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0)
c  in CNF:
c     b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_2
c     b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_1
c     b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨  b^{215, 2}_0
c  in DIMACS:
 22211 -22212  22213  215 -22214 0
 22211 -22212  22213  215 -22215 0
 22211 -22212  22213  215  22216 0

c  1-1 --> 0
c    (-b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧  b^{215, 1}_0 ∧ -p_215) -> (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧ -b^{215, 2}_0)
c  in CNF:
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_2
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_1
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_0
c  in DIMACS:
 22211  22212 -22213  215 -22214 0
 22211  22212 -22213  215 -22215 0
 22211  22212 -22213  215 -22216 0

c  0-1 --> -1
c    (-b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧ -p_215) -> ( b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0)
c  in CNF:
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨  b^{215, 2}_2
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_1
c     b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨  b^{215, 2}_0
c  in DIMACS:
 22211  22212  22213  215  22214 0
 22211  22212  22213  215 -22215 0
 22211  22212  22213  215  22216 0

c  -1-1 --> -2
c    ( b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧  b^{215, 1}_0 ∧ -p_215) -> ( b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0)
c  in CNF:
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨  b^{215, 2}_2
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨  b^{215, 2}_1
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨  p_215 ∨ -b^{215, 2}_0
c  in DIMACS:
-22211  22212 -22213  215  22214 0
-22211  22212 -22213  215  22215 0
-22211  22212 -22213  215 -22216 0

c  -2-1 --> break 
c    ( b^{215, 1}_2 ∧  b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧ -p_215) -> break
c  in CNF:
c    -b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨  b^{215, 1}_0 ∨  p_215 ∨ break
c  in DIMACS:
-22211 -22212  22213  215 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{215, 1}_2 ∧ -b^{215, 1}_1 ∧ -b^{215, 1}_0 ∧ true) 
c  in CNF:
c    -b^{215, 1}_2 ∨  b^{215, 1}_1 ∨  b^{215, 1}_0 ∨ false 
c  in DIMACS:
-22211  22212  22213  0

c  3 does not represent an automaton state.
c    -(-b^{215, 1}_2 ∧  b^{215, 1}_1 ∧  b^{215, 1}_0 ∧ true) 
c  in CNF:
c     b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ false 
c  in DIMACS:
 22211 -22212 -22213  0
c  -3 does not represent an automaton state.
c    -( b^{215, 1}_2 ∧  b^{215, 1}_1 ∧  b^{215, 1}_0 ∧ true) 
c  in CNF:
c    -b^{215, 1}_2 ∨ -b^{215, 1}_1 ∨ -b^{215, 1}_0 ∨ false 
c  in DIMACS:
-22211 -22212 -22213  0

c i = 2
c  -2+1 --> -1
c    ( b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧  p_430) -> ( b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0)
c  in CNF:
c    -b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨  b^{215, 3}_2
c    -b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_1
c    -b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨  b^{215, 3}_0
c  in DIMACS:
-22214 -22215  22216 -430  22217 0
-22214 -22215  22216 -430 -22218 0
-22214 -22215  22216 -430  22219 0

c  -1+1 --> 0
c    ( b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0 ∧  p_430) -> (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧ -b^{215, 3}_0)
c  in CNF:
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_2
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_1
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_0
c  in DIMACS:
-22214  22215 -22216 -430 -22217 0
-22214  22215 -22216 -430 -22218 0
-22214  22215 -22216 -430 -22219 0

c  0+1 --> 1
c    (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧  p_430) -> (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0)
c  in CNF:
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_2
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_1
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨  b^{215, 3}_0
c  in DIMACS:
 22214  22215  22216 -430 -22217 0
 22214  22215  22216 -430 -22218 0
 22214  22215  22216 -430  22219 0

c  1+1 --> 2
c    (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0 ∧  p_430) -> (-b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0)
c  in CNF:
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_2
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨  b^{215, 3}_1
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ -p_430 ∨ -b^{215, 3}_0
c  in DIMACS:
 22214  22215 -22216 -430 -22217 0
 22214  22215 -22216 -430  22218 0
 22214  22215 -22216 -430 -22219 0

c  2+1 --> break 
c    (-b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧  p_430) -> break
c  in CNF:
c     b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ -p_430 ∨ break
c  in DIMACS:
 22214 -22215  22216 -430 1162 0


c  2-1 --> 1
c    (-b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧ -p_430) -> (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0)
c  in CNF:
c     b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_2
c     b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_1
c     b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨  b^{215, 3}_0
c  in DIMACS:
 22214 -22215  22216  430 -22217 0
 22214 -22215  22216  430 -22218 0
 22214 -22215  22216  430  22219 0

c  1-1 --> 0
c    (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0 ∧ -p_430) -> (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧ -b^{215, 3}_0)
c  in CNF:
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_2
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_1
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_0
c  in DIMACS:
 22214  22215 -22216  430 -22217 0
 22214  22215 -22216  430 -22218 0
 22214  22215 -22216  430 -22219 0

c  0-1 --> -1
c    (-b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧ -p_430) -> ( b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0)
c  in CNF:
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨  b^{215, 3}_2
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_1
c     b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨  b^{215, 3}_0
c  in DIMACS:
 22214  22215  22216  430  22217 0
 22214  22215  22216  430 -22218 0
 22214  22215  22216  430  22219 0

c  -1-1 --> -2
c    ( b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧  b^{215, 2}_0 ∧ -p_430) -> ( b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0)
c  in CNF:
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨  b^{215, 3}_2
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨  b^{215, 3}_1
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨  p_430 ∨ -b^{215, 3}_0
c  in DIMACS:
-22214  22215 -22216  430  22217 0
-22214  22215 -22216  430  22218 0
-22214  22215 -22216  430 -22219 0

c  -2-1 --> break 
c    ( b^{215, 2}_2 ∧  b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧ -p_430) -> break
c  in CNF:
c    -b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨  b^{215, 2}_0 ∨  p_430 ∨ break
c  in DIMACS:
-22214 -22215  22216  430 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{215, 2}_2 ∧ -b^{215, 2}_1 ∧ -b^{215, 2}_0 ∧ true) 
c  in CNF:
c    -b^{215, 2}_2 ∨  b^{215, 2}_1 ∨  b^{215, 2}_0 ∨ false 
c  in DIMACS:
-22214  22215  22216  0

c  3 does not represent an automaton state.
c    -(-b^{215, 2}_2 ∧  b^{215, 2}_1 ∧  b^{215, 2}_0 ∧ true) 
c  in CNF:
c     b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ false 
c  in DIMACS:
 22214 -22215 -22216  0
c  -3 does not represent an automaton state.
c    -( b^{215, 2}_2 ∧  b^{215, 2}_1 ∧  b^{215, 2}_0 ∧ true) 
c  in CNF:
c    -b^{215, 2}_2 ∨ -b^{215, 2}_1 ∨ -b^{215, 2}_0 ∨ false 
c  in DIMACS:
-22214 -22215 -22216  0

c i = 3
c  -2+1 --> -1
c    ( b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧  p_645) -> ( b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0)
c  in CNF:
c    -b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨  b^{215, 4}_2
c    -b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_1
c    -b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨  b^{215, 4}_0
c  in DIMACS:
-22217 -22218  22219 -645  22220 0
-22217 -22218  22219 -645 -22221 0
-22217 -22218  22219 -645  22222 0

c  -1+1 --> 0
c    ( b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0 ∧  p_645) -> (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧ -b^{215, 4}_0)
c  in CNF:
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_2
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_1
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_0
c  in DIMACS:
-22217  22218 -22219 -645 -22220 0
-22217  22218 -22219 -645 -22221 0
-22217  22218 -22219 -645 -22222 0

c  0+1 --> 1
c    (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧  p_645) -> (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0)
c  in CNF:
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_2
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_1
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨  b^{215, 4}_0
c  in DIMACS:
 22217  22218  22219 -645 -22220 0
 22217  22218  22219 -645 -22221 0
 22217  22218  22219 -645  22222 0

c  1+1 --> 2
c    (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0 ∧  p_645) -> (-b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0)
c  in CNF:
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_2
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨  b^{215, 4}_1
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ -p_645 ∨ -b^{215, 4}_0
c  in DIMACS:
 22217  22218 -22219 -645 -22220 0
 22217  22218 -22219 -645  22221 0
 22217  22218 -22219 -645 -22222 0

c  2+1 --> break 
c    (-b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧  p_645) -> break
c  in CNF:
c     b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ -p_645 ∨ break
c  in DIMACS:
 22217 -22218  22219 -645 1162 0


c  2-1 --> 1
c    (-b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧ -p_645) -> (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0)
c  in CNF:
c     b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_2
c     b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_1
c     b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨  b^{215, 4}_0
c  in DIMACS:
 22217 -22218  22219  645 -22220 0
 22217 -22218  22219  645 -22221 0
 22217 -22218  22219  645  22222 0

c  1-1 --> 0
c    (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0 ∧ -p_645) -> (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧ -b^{215, 4}_0)
c  in CNF:
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_2
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_1
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_0
c  in DIMACS:
 22217  22218 -22219  645 -22220 0
 22217  22218 -22219  645 -22221 0
 22217  22218 -22219  645 -22222 0

c  0-1 --> -1
c    (-b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧ -p_645) -> ( b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0)
c  in CNF:
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨  b^{215, 4}_2
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_1
c     b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨  b^{215, 4}_0
c  in DIMACS:
 22217  22218  22219  645  22220 0
 22217  22218  22219  645 -22221 0
 22217  22218  22219  645  22222 0

c  -1-1 --> -2
c    ( b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧  b^{215, 3}_0 ∧ -p_645) -> ( b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0)
c  in CNF:
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨  b^{215, 4}_2
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨  b^{215, 4}_1
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨  p_645 ∨ -b^{215, 4}_0
c  in DIMACS:
-22217  22218 -22219  645  22220 0
-22217  22218 -22219  645  22221 0
-22217  22218 -22219  645 -22222 0

c  -2-1 --> break 
c    ( b^{215, 3}_2 ∧  b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧ -p_645) -> break
c  in CNF:
c    -b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨  b^{215, 3}_0 ∨  p_645 ∨ break
c  in DIMACS:
-22217 -22218  22219  645 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{215, 3}_2 ∧ -b^{215, 3}_1 ∧ -b^{215, 3}_0 ∧ true) 
c  in CNF:
c    -b^{215, 3}_2 ∨  b^{215, 3}_1 ∨  b^{215, 3}_0 ∨ false 
c  in DIMACS:
-22217  22218  22219  0

c  3 does not represent an automaton state.
c    -(-b^{215, 3}_2 ∧  b^{215, 3}_1 ∧  b^{215, 3}_0 ∧ true) 
c  in CNF:
c     b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ false 
c  in DIMACS:
 22217 -22218 -22219  0
c  -3 does not represent an automaton state.
c    -( b^{215, 3}_2 ∧  b^{215, 3}_1 ∧  b^{215, 3}_0 ∧ true) 
c  in CNF:
c    -b^{215, 3}_2 ∨ -b^{215, 3}_1 ∨ -b^{215, 3}_0 ∨ false 
c  in DIMACS:
-22217 -22218 -22219  0

c i = 4
c  -2+1 --> -1
c    ( b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧  p_860) -> ( b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0)
c  in CNF:
c    -b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨  b^{215, 5}_2
c    -b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_1
c    -b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨  b^{215, 5}_0
c  in DIMACS:
-22220 -22221  22222 -860  22223 0
-22220 -22221  22222 -860 -22224 0
-22220 -22221  22222 -860  22225 0

c  -1+1 --> 0
c    ( b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0 ∧  p_860) -> (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧ -b^{215, 5}_0)
c  in CNF:
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_2
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_1
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_0
c  in DIMACS:
-22220  22221 -22222 -860 -22223 0
-22220  22221 -22222 -860 -22224 0
-22220  22221 -22222 -860 -22225 0

c  0+1 --> 1
c    (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧  p_860) -> (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0)
c  in CNF:
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_2
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_1
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨  b^{215, 5}_0
c  in DIMACS:
 22220  22221  22222 -860 -22223 0
 22220  22221  22222 -860 -22224 0
 22220  22221  22222 -860  22225 0

c  1+1 --> 2
c    (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0 ∧  p_860) -> (-b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0)
c  in CNF:
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_2
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨  b^{215, 5}_1
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ -p_860 ∨ -b^{215, 5}_0
c  in DIMACS:
 22220  22221 -22222 -860 -22223 0
 22220  22221 -22222 -860  22224 0
 22220  22221 -22222 -860 -22225 0

c  2+1 --> break 
c    (-b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧  p_860) -> break
c  in CNF:
c     b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ -p_860 ∨ break
c  in DIMACS:
 22220 -22221  22222 -860 1162 0


c  2-1 --> 1
c    (-b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧ -p_860) -> (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0)
c  in CNF:
c     b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_2
c     b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_1
c     b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨  b^{215, 5}_0
c  in DIMACS:
 22220 -22221  22222  860 -22223 0
 22220 -22221  22222  860 -22224 0
 22220 -22221  22222  860  22225 0

c  1-1 --> 0
c    (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0 ∧ -p_860) -> (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧ -b^{215, 5}_0)
c  in CNF:
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_2
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_1
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_0
c  in DIMACS:
 22220  22221 -22222  860 -22223 0
 22220  22221 -22222  860 -22224 0
 22220  22221 -22222  860 -22225 0

c  0-1 --> -1
c    (-b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧ -p_860) -> ( b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0)
c  in CNF:
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨  b^{215, 5}_2
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_1
c     b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨  b^{215, 5}_0
c  in DIMACS:
 22220  22221  22222  860  22223 0
 22220  22221  22222  860 -22224 0
 22220  22221  22222  860  22225 0

c  -1-1 --> -2
c    ( b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧  b^{215, 4}_0 ∧ -p_860) -> ( b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0)
c  in CNF:
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨  b^{215, 5}_2
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨  b^{215, 5}_1
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨  p_860 ∨ -b^{215, 5}_0
c  in DIMACS:
-22220  22221 -22222  860  22223 0
-22220  22221 -22222  860  22224 0
-22220  22221 -22222  860 -22225 0

c  -2-1 --> break 
c    ( b^{215, 4}_2 ∧  b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧ -p_860) -> break
c  in CNF:
c    -b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨  b^{215, 4}_0 ∨  p_860 ∨ break
c  in DIMACS:
-22220 -22221  22222  860 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{215, 4}_2 ∧ -b^{215, 4}_1 ∧ -b^{215, 4}_0 ∧ true) 
c  in CNF:
c    -b^{215, 4}_2 ∨  b^{215, 4}_1 ∨  b^{215, 4}_0 ∨ false 
c  in DIMACS:
-22220  22221  22222  0

c  3 does not represent an automaton state.
c    -(-b^{215, 4}_2 ∧  b^{215, 4}_1 ∧  b^{215, 4}_0 ∧ true) 
c  in CNF:
c     b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ false 
c  in DIMACS:
 22220 -22221 -22222  0
c  -3 does not represent an automaton state.
c    -( b^{215, 4}_2 ∧  b^{215, 4}_1 ∧  b^{215, 4}_0 ∧ true) 
c  in CNF:
c    -b^{215, 4}_2 ∨ -b^{215, 4}_1 ∨ -b^{215, 4}_0 ∨ false 
c  in DIMACS:
-22220 -22221 -22222  0

c i = 5
c  -2+1 --> -1
c    ( b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧  p_1075) -> ( b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧  b^{215, 6}_0)
c  in CNF:
c    -b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨  b^{215, 6}_2
c    -b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_1
c    -b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨  b^{215, 6}_0
c  in DIMACS:
-22223 -22224  22225 -1075  22226 0
-22223 -22224  22225 -1075 -22227 0
-22223 -22224  22225 -1075  22228 0

c  -1+1 --> 0
c    ( b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0 ∧  p_1075) -> (-b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧ -b^{215, 6}_0)
c  in CNF:
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_2
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_1
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_0
c  in DIMACS:
-22223  22224 -22225 -1075 -22226 0
-22223  22224 -22225 -1075 -22227 0
-22223  22224 -22225 -1075 -22228 0

c  0+1 --> 1
c    (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧  p_1075) -> (-b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧  b^{215, 6}_0)
c  in CNF:
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_2
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_1
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨  b^{215, 6}_0
c  in DIMACS:
 22223  22224  22225 -1075 -22226 0
 22223  22224  22225 -1075 -22227 0
 22223  22224  22225 -1075  22228 0

c  1+1 --> 2
c    (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0 ∧  p_1075) -> (-b^{215, 6}_2 ∧  b^{215, 6}_1 ∧ -b^{215, 6}_0)
c  in CNF:
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_2
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨  b^{215, 6}_1
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ -p_1075 ∨ -b^{215, 6}_0
c  in DIMACS:
 22223  22224 -22225 -1075 -22226 0
 22223  22224 -22225 -1075  22227 0
 22223  22224 -22225 -1075 -22228 0

c  2+1 --> break 
c    (-b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧  p_1075) -> break
c  in CNF:
c     b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ -p_1075 ∨ break
c  in DIMACS:
 22223 -22224  22225 -1075 1162 0


c  2-1 --> 1
c    (-b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧ -p_1075) -> (-b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧  b^{215, 6}_0)
c  in CNF:
c     b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_2
c     b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_1
c     b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨  b^{215, 6}_0
c  in DIMACS:
 22223 -22224  22225  1075 -22226 0
 22223 -22224  22225  1075 -22227 0
 22223 -22224  22225  1075  22228 0

c  1-1 --> 0
c    (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0 ∧ -p_1075) -> (-b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧ -b^{215, 6}_0)
c  in CNF:
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_2
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_1
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_0
c  in DIMACS:
 22223  22224 -22225  1075 -22226 0
 22223  22224 -22225  1075 -22227 0
 22223  22224 -22225  1075 -22228 0

c  0-1 --> -1
c    (-b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧ -p_1075) -> ( b^{215, 6}_2 ∧ -b^{215, 6}_1 ∧  b^{215, 6}_0)
c  in CNF:
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨  b^{215, 6}_2
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_1
c     b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨  b^{215, 6}_0
c  in DIMACS:
 22223  22224  22225  1075  22226 0
 22223  22224  22225  1075 -22227 0
 22223  22224  22225  1075  22228 0

c  -1-1 --> -2
c    ( b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧  b^{215, 5}_0 ∧ -p_1075) -> ( b^{215, 6}_2 ∧  b^{215, 6}_1 ∧ -b^{215, 6}_0)
c  in CNF:
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨  b^{215, 6}_2
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨  b^{215, 6}_1
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨  p_1075 ∨ -b^{215, 6}_0
c  in DIMACS:
-22223  22224 -22225  1075  22226 0
-22223  22224 -22225  1075  22227 0
-22223  22224 -22225  1075 -22228 0

c  -2-1 --> break 
c    ( b^{215, 5}_2 ∧  b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧ -p_1075) -> break
c  in CNF:
c    -b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨  b^{215, 5}_0 ∨  p_1075 ∨ break
c  in DIMACS:
-22223 -22224  22225  1075 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{215, 5}_2 ∧ -b^{215, 5}_1 ∧ -b^{215, 5}_0 ∧ true) 
c  in CNF:
c    -b^{215, 5}_2 ∨  b^{215, 5}_1 ∨  b^{215, 5}_0 ∨ false 
c  in DIMACS:
-22223  22224  22225  0

c  3 does not represent an automaton state.
c    -(-b^{215, 5}_2 ∧  b^{215, 5}_1 ∧  b^{215, 5}_0 ∧ true) 
c  in CNF:
c     b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ false 
c  in DIMACS:
 22223 -22224 -22225  0
c  -3 does not represent an automaton state.
c    -( b^{215, 5}_2 ∧  b^{215, 5}_1 ∧  b^{215, 5}_0 ∧ true) 
c  in CNF:
c    -b^{215, 5}_2 ∨ -b^{215, 5}_1 ∨ -b^{215, 5}_0 ∨ false 
c  in DIMACS:
-22223 -22224 -22225  0

c INIT for k = 216
c    -b^{216, 1}_2
c    -b^{216, 1}_1
c    -b^{216, 1}_0
c  in DIMACS:
-22229 0
-22230 0
-22231 0

c Transitions for k = 216
c i = 1
c  -2+1 --> -1
c    ( b^{216, 1}_2 ∧  b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧  p_216) -> ( b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0)
c  in CNF:
c    -b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨  b^{216, 2}_2
c    -b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_1
c    -b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨  b^{216, 2}_0
c  in DIMACS:
-22229 -22230  22231 -216  22232 0
-22229 -22230  22231 -216 -22233 0
-22229 -22230  22231 -216  22234 0

c  -1+1 --> 0
c    ( b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧  b^{216, 1}_0 ∧  p_216) -> (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧ -b^{216, 2}_0)
c  in CNF:
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_2
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_1
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_0
c  in DIMACS:
-22229  22230 -22231 -216 -22232 0
-22229  22230 -22231 -216 -22233 0
-22229  22230 -22231 -216 -22234 0

c  0+1 --> 1
c    (-b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧  p_216) -> (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0)
c  in CNF:
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_2
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_1
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨  b^{216, 2}_0
c  in DIMACS:
 22229  22230  22231 -216 -22232 0
 22229  22230  22231 -216 -22233 0
 22229  22230  22231 -216  22234 0

c  1+1 --> 2
c    (-b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧  b^{216, 1}_0 ∧  p_216) -> (-b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0)
c  in CNF:
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_2
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨  b^{216, 2}_1
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ -p_216 ∨ -b^{216, 2}_0
c  in DIMACS:
 22229  22230 -22231 -216 -22232 0
 22229  22230 -22231 -216  22233 0
 22229  22230 -22231 -216 -22234 0

c  2+1 --> break 
c    (-b^{216, 1}_2 ∧  b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧  p_216) -> break
c  in CNF:
c     b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ -p_216 ∨ break
c  in DIMACS:
 22229 -22230  22231 -216 1162 0


c  2-1 --> 1
c    (-b^{216, 1}_2 ∧  b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧ -p_216) -> (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0)
c  in CNF:
c     b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_2
c     b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_1
c     b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨  b^{216, 2}_0
c  in DIMACS:
 22229 -22230  22231  216 -22232 0
 22229 -22230  22231  216 -22233 0
 22229 -22230  22231  216  22234 0

c  1-1 --> 0
c    (-b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧  b^{216, 1}_0 ∧ -p_216) -> (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧ -b^{216, 2}_0)
c  in CNF:
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_2
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_1
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_0
c  in DIMACS:
 22229  22230 -22231  216 -22232 0
 22229  22230 -22231  216 -22233 0
 22229  22230 -22231  216 -22234 0

c  0-1 --> -1
c    (-b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧ -p_216) -> ( b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0)
c  in CNF:
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨  b^{216, 2}_2
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_1
c     b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨  b^{216, 2}_0
c  in DIMACS:
 22229  22230  22231  216  22232 0
 22229  22230  22231  216 -22233 0
 22229  22230  22231  216  22234 0

c  -1-1 --> -2
c    ( b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧  b^{216, 1}_0 ∧ -p_216) -> ( b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0)
c  in CNF:
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨  b^{216, 2}_2
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨  b^{216, 2}_1
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨  p_216 ∨ -b^{216, 2}_0
c  in DIMACS:
-22229  22230 -22231  216  22232 0
-22229  22230 -22231  216  22233 0
-22229  22230 -22231  216 -22234 0

c  -2-1 --> break 
c    ( b^{216, 1}_2 ∧  b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧ -p_216) -> break
c  in CNF:
c    -b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨  b^{216, 1}_0 ∨  p_216 ∨ break
c  in DIMACS:
-22229 -22230  22231  216 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{216, 1}_2 ∧ -b^{216, 1}_1 ∧ -b^{216, 1}_0 ∧ true) 
c  in CNF:
c    -b^{216, 1}_2 ∨  b^{216, 1}_1 ∨  b^{216, 1}_0 ∨ false 
c  in DIMACS:
-22229  22230  22231  0

c  3 does not represent an automaton state.
c    -(-b^{216, 1}_2 ∧  b^{216, 1}_1 ∧  b^{216, 1}_0 ∧ true) 
c  in CNF:
c     b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ false 
c  in DIMACS:
 22229 -22230 -22231  0
c  -3 does not represent an automaton state.
c    -( b^{216, 1}_2 ∧  b^{216, 1}_1 ∧  b^{216, 1}_0 ∧ true) 
c  in CNF:
c    -b^{216, 1}_2 ∨ -b^{216, 1}_1 ∨ -b^{216, 1}_0 ∨ false 
c  in DIMACS:
-22229 -22230 -22231  0

c i = 2
c  -2+1 --> -1
c    ( b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧  p_432) -> ( b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0)
c  in CNF:
c    -b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨  b^{216, 3}_2
c    -b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_1
c    -b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨  b^{216, 3}_0
c  in DIMACS:
-22232 -22233  22234 -432  22235 0
-22232 -22233  22234 -432 -22236 0
-22232 -22233  22234 -432  22237 0

c  -1+1 --> 0
c    ( b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0 ∧  p_432) -> (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧ -b^{216, 3}_0)
c  in CNF:
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_2
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_1
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_0
c  in DIMACS:
-22232  22233 -22234 -432 -22235 0
-22232  22233 -22234 -432 -22236 0
-22232  22233 -22234 -432 -22237 0

c  0+1 --> 1
c    (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧  p_432) -> (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0)
c  in CNF:
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_2
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_1
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨  b^{216, 3}_0
c  in DIMACS:
 22232  22233  22234 -432 -22235 0
 22232  22233  22234 -432 -22236 0
 22232  22233  22234 -432  22237 0

c  1+1 --> 2
c    (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0 ∧  p_432) -> (-b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0)
c  in CNF:
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_2
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨  b^{216, 3}_1
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ -p_432 ∨ -b^{216, 3}_0
c  in DIMACS:
 22232  22233 -22234 -432 -22235 0
 22232  22233 -22234 -432  22236 0
 22232  22233 -22234 -432 -22237 0

c  2+1 --> break 
c    (-b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧  p_432) -> break
c  in CNF:
c     b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ -p_432 ∨ break
c  in DIMACS:
 22232 -22233  22234 -432 1162 0


c  2-1 --> 1
c    (-b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧ -p_432) -> (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0)
c  in CNF:
c     b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_2
c     b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_1
c     b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨  b^{216, 3}_0
c  in DIMACS:
 22232 -22233  22234  432 -22235 0
 22232 -22233  22234  432 -22236 0
 22232 -22233  22234  432  22237 0

c  1-1 --> 0
c    (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0 ∧ -p_432) -> (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧ -b^{216, 3}_0)
c  in CNF:
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_2
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_1
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_0
c  in DIMACS:
 22232  22233 -22234  432 -22235 0
 22232  22233 -22234  432 -22236 0
 22232  22233 -22234  432 -22237 0

c  0-1 --> -1
c    (-b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧ -p_432) -> ( b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0)
c  in CNF:
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨  b^{216, 3}_2
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_1
c     b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨  b^{216, 3}_0
c  in DIMACS:
 22232  22233  22234  432  22235 0
 22232  22233  22234  432 -22236 0
 22232  22233  22234  432  22237 0

c  -1-1 --> -2
c    ( b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧  b^{216, 2}_0 ∧ -p_432) -> ( b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0)
c  in CNF:
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨  b^{216, 3}_2
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨  b^{216, 3}_1
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨  p_432 ∨ -b^{216, 3}_0
c  in DIMACS:
-22232  22233 -22234  432  22235 0
-22232  22233 -22234  432  22236 0
-22232  22233 -22234  432 -22237 0

c  -2-1 --> break 
c    ( b^{216, 2}_2 ∧  b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧ -p_432) -> break
c  in CNF:
c    -b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨  b^{216, 2}_0 ∨  p_432 ∨ break
c  in DIMACS:
-22232 -22233  22234  432 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{216, 2}_2 ∧ -b^{216, 2}_1 ∧ -b^{216, 2}_0 ∧ true) 
c  in CNF:
c    -b^{216, 2}_2 ∨  b^{216, 2}_1 ∨  b^{216, 2}_0 ∨ false 
c  in DIMACS:
-22232  22233  22234  0

c  3 does not represent an automaton state.
c    -(-b^{216, 2}_2 ∧  b^{216, 2}_1 ∧  b^{216, 2}_0 ∧ true) 
c  in CNF:
c     b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ false 
c  in DIMACS:
 22232 -22233 -22234  0
c  -3 does not represent an automaton state.
c    -( b^{216, 2}_2 ∧  b^{216, 2}_1 ∧  b^{216, 2}_0 ∧ true) 
c  in CNF:
c    -b^{216, 2}_2 ∨ -b^{216, 2}_1 ∨ -b^{216, 2}_0 ∨ false 
c  in DIMACS:
-22232 -22233 -22234  0

c i = 3
c  -2+1 --> -1
c    ( b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧  p_648) -> ( b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0)
c  in CNF:
c    -b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨  b^{216, 4}_2
c    -b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_1
c    -b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨  b^{216, 4}_0
c  in DIMACS:
-22235 -22236  22237 -648  22238 0
-22235 -22236  22237 -648 -22239 0
-22235 -22236  22237 -648  22240 0

c  -1+1 --> 0
c    ( b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0 ∧  p_648) -> (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧ -b^{216, 4}_0)
c  in CNF:
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_2
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_1
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_0
c  in DIMACS:
-22235  22236 -22237 -648 -22238 0
-22235  22236 -22237 -648 -22239 0
-22235  22236 -22237 -648 -22240 0

c  0+1 --> 1
c    (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧  p_648) -> (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0)
c  in CNF:
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_2
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_1
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨  b^{216, 4}_0
c  in DIMACS:
 22235  22236  22237 -648 -22238 0
 22235  22236  22237 -648 -22239 0
 22235  22236  22237 -648  22240 0

c  1+1 --> 2
c    (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0 ∧  p_648) -> (-b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0)
c  in CNF:
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_2
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨  b^{216, 4}_1
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ -p_648 ∨ -b^{216, 4}_0
c  in DIMACS:
 22235  22236 -22237 -648 -22238 0
 22235  22236 -22237 -648  22239 0
 22235  22236 -22237 -648 -22240 0

c  2+1 --> break 
c    (-b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧  p_648) -> break
c  in CNF:
c     b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 22235 -22236  22237 -648 1162 0


c  2-1 --> 1
c    (-b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧ -p_648) -> (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0)
c  in CNF:
c     b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_2
c     b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_1
c     b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨  b^{216, 4}_0
c  in DIMACS:
 22235 -22236  22237  648 -22238 0
 22235 -22236  22237  648 -22239 0
 22235 -22236  22237  648  22240 0

c  1-1 --> 0
c    (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0 ∧ -p_648) -> (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧ -b^{216, 4}_0)
c  in CNF:
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_2
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_1
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_0
c  in DIMACS:
 22235  22236 -22237  648 -22238 0
 22235  22236 -22237  648 -22239 0
 22235  22236 -22237  648 -22240 0

c  0-1 --> -1
c    (-b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧ -p_648) -> ( b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0)
c  in CNF:
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨  b^{216, 4}_2
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_1
c     b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨  b^{216, 4}_0
c  in DIMACS:
 22235  22236  22237  648  22238 0
 22235  22236  22237  648 -22239 0
 22235  22236  22237  648  22240 0

c  -1-1 --> -2
c    ( b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧  b^{216, 3}_0 ∧ -p_648) -> ( b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0)
c  in CNF:
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨  b^{216, 4}_2
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨  b^{216, 4}_1
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨  p_648 ∨ -b^{216, 4}_0
c  in DIMACS:
-22235  22236 -22237  648  22238 0
-22235  22236 -22237  648  22239 0
-22235  22236 -22237  648 -22240 0

c  -2-1 --> break 
c    ( b^{216, 3}_2 ∧  b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨  b^{216, 3}_0 ∨  p_648 ∨ break
c  in DIMACS:
-22235 -22236  22237  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{216, 3}_2 ∧ -b^{216, 3}_1 ∧ -b^{216, 3}_0 ∧ true) 
c  in CNF:
c    -b^{216, 3}_2 ∨  b^{216, 3}_1 ∨  b^{216, 3}_0 ∨ false 
c  in DIMACS:
-22235  22236  22237  0

c  3 does not represent an automaton state.
c    -(-b^{216, 3}_2 ∧  b^{216, 3}_1 ∧  b^{216, 3}_0 ∧ true) 
c  in CNF:
c     b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ false 
c  in DIMACS:
 22235 -22236 -22237  0
c  -3 does not represent an automaton state.
c    -( b^{216, 3}_2 ∧  b^{216, 3}_1 ∧  b^{216, 3}_0 ∧ true) 
c  in CNF:
c    -b^{216, 3}_2 ∨ -b^{216, 3}_1 ∨ -b^{216, 3}_0 ∨ false 
c  in DIMACS:
-22235 -22236 -22237  0

c i = 4
c  -2+1 --> -1
c    ( b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧  p_864) -> ( b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0)
c  in CNF:
c    -b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨  b^{216, 5}_2
c    -b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_1
c    -b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨  b^{216, 5}_0
c  in DIMACS:
-22238 -22239  22240 -864  22241 0
-22238 -22239  22240 -864 -22242 0
-22238 -22239  22240 -864  22243 0

c  -1+1 --> 0
c    ( b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0 ∧  p_864) -> (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧ -b^{216, 5}_0)
c  in CNF:
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_2
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_1
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_0
c  in DIMACS:
-22238  22239 -22240 -864 -22241 0
-22238  22239 -22240 -864 -22242 0
-22238  22239 -22240 -864 -22243 0

c  0+1 --> 1
c    (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧  p_864) -> (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0)
c  in CNF:
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_2
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_1
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨  b^{216, 5}_0
c  in DIMACS:
 22238  22239  22240 -864 -22241 0
 22238  22239  22240 -864 -22242 0
 22238  22239  22240 -864  22243 0

c  1+1 --> 2
c    (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0 ∧  p_864) -> (-b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0)
c  in CNF:
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_2
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨  b^{216, 5}_1
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ -p_864 ∨ -b^{216, 5}_0
c  in DIMACS:
 22238  22239 -22240 -864 -22241 0
 22238  22239 -22240 -864  22242 0
 22238  22239 -22240 -864 -22243 0

c  2+1 --> break 
c    (-b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧  p_864) -> break
c  in CNF:
c     b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 22238 -22239  22240 -864 1162 0


c  2-1 --> 1
c    (-b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧ -p_864) -> (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0)
c  in CNF:
c     b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_2
c     b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_1
c     b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨  b^{216, 5}_0
c  in DIMACS:
 22238 -22239  22240  864 -22241 0
 22238 -22239  22240  864 -22242 0
 22238 -22239  22240  864  22243 0

c  1-1 --> 0
c    (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0 ∧ -p_864) -> (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧ -b^{216, 5}_0)
c  in CNF:
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_2
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_1
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_0
c  in DIMACS:
 22238  22239 -22240  864 -22241 0
 22238  22239 -22240  864 -22242 0
 22238  22239 -22240  864 -22243 0

c  0-1 --> -1
c    (-b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧ -p_864) -> ( b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0)
c  in CNF:
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨  b^{216, 5}_2
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_1
c     b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨  b^{216, 5}_0
c  in DIMACS:
 22238  22239  22240  864  22241 0
 22238  22239  22240  864 -22242 0
 22238  22239  22240  864  22243 0

c  -1-1 --> -2
c    ( b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧  b^{216, 4}_0 ∧ -p_864) -> ( b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0)
c  in CNF:
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨  b^{216, 5}_2
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨  b^{216, 5}_1
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨  p_864 ∨ -b^{216, 5}_0
c  in DIMACS:
-22238  22239 -22240  864  22241 0
-22238  22239 -22240  864  22242 0
-22238  22239 -22240  864 -22243 0

c  -2-1 --> break 
c    ( b^{216, 4}_2 ∧  b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨  b^{216, 4}_0 ∨  p_864 ∨ break
c  in DIMACS:
-22238 -22239  22240  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{216, 4}_2 ∧ -b^{216, 4}_1 ∧ -b^{216, 4}_0 ∧ true) 
c  in CNF:
c    -b^{216, 4}_2 ∨  b^{216, 4}_1 ∨  b^{216, 4}_0 ∨ false 
c  in DIMACS:
-22238  22239  22240  0

c  3 does not represent an automaton state.
c    -(-b^{216, 4}_2 ∧  b^{216, 4}_1 ∧  b^{216, 4}_0 ∧ true) 
c  in CNF:
c     b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ false 
c  in DIMACS:
 22238 -22239 -22240  0
c  -3 does not represent an automaton state.
c    -( b^{216, 4}_2 ∧  b^{216, 4}_1 ∧  b^{216, 4}_0 ∧ true) 
c  in CNF:
c    -b^{216, 4}_2 ∨ -b^{216, 4}_1 ∨ -b^{216, 4}_0 ∨ false 
c  in DIMACS:
-22238 -22239 -22240  0

c i = 5
c  -2+1 --> -1
c    ( b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧  p_1080) -> ( b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧  b^{216, 6}_0)
c  in CNF:
c    -b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨  b^{216, 6}_2
c    -b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_1
c    -b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨  b^{216, 6}_0
c  in DIMACS:
-22241 -22242  22243 -1080  22244 0
-22241 -22242  22243 -1080 -22245 0
-22241 -22242  22243 -1080  22246 0

c  -1+1 --> 0
c    ( b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0 ∧  p_1080) -> (-b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧ -b^{216, 6}_0)
c  in CNF:
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_2
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_1
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_0
c  in DIMACS:
-22241  22242 -22243 -1080 -22244 0
-22241  22242 -22243 -1080 -22245 0
-22241  22242 -22243 -1080 -22246 0

c  0+1 --> 1
c    (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧  p_1080) -> (-b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧  b^{216, 6}_0)
c  in CNF:
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_2
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_1
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨  b^{216, 6}_0
c  in DIMACS:
 22241  22242  22243 -1080 -22244 0
 22241  22242  22243 -1080 -22245 0
 22241  22242  22243 -1080  22246 0

c  1+1 --> 2
c    (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0 ∧  p_1080) -> (-b^{216, 6}_2 ∧  b^{216, 6}_1 ∧ -b^{216, 6}_0)
c  in CNF:
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_2
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨  b^{216, 6}_1
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ -p_1080 ∨ -b^{216, 6}_0
c  in DIMACS:
 22241  22242 -22243 -1080 -22244 0
 22241  22242 -22243 -1080  22245 0
 22241  22242 -22243 -1080 -22246 0

c  2+1 --> break 
c    (-b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 22241 -22242  22243 -1080 1162 0


c  2-1 --> 1
c    (-b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧ -p_1080) -> (-b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧  b^{216, 6}_0)
c  in CNF:
c     b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_2
c     b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_1
c     b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨  b^{216, 6}_0
c  in DIMACS:
 22241 -22242  22243  1080 -22244 0
 22241 -22242  22243  1080 -22245 0
 22241 -22242  22243  1080  22246 0

c  1-1 --> 0
c    (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0 ∧ -p_1080) -> (-b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧ -b^{216, 6}_0)
c  in CNF:
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_2
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_1
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_0
c  in DIMACS:
 22241  22242 -22243  1080 -22244 0
 22241  22242 -22243  1080 -22245 0
 22241  22242 -22243  1080 -22246 0

c  0-1 --> -1
c    (-b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧ -p_1080) -> ( b^{216, 6}_2 ∧ -b^{216, 6}_1 ∧  b^{216, 6}_0)
c  in CNF:
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨  b^{216, 6}_2
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_1
c     b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨  b^{216, 6}_0
c  in DIMACS:
 22241  22242  22243  1080  22244 0
 22241  22242  22243  1080 -22245 0
 22241  22242  22243  1080  22246 0

c  -1-1 --> -2
c    ( b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧  b^{216, 5}_0 ∧ -p_1080) -> ( b^{216, 6}_2 ∧  b^{216, 6}_1 ∧ -b^{216, 6}_0)
c  in CNF:
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨  b^{216, 6}_2
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨  b^{216, 6}_1
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨  p_1080 ∨ -b^{216, 6}_0
c  in DIMACS:
-22241  22242 -22243  1080  22244 0
-22241  22242 -22243  1080  22245 0
-22241  22242 -22243  1080 -22246 0

c  -2-1 --> break 
c    ( b^{216, 5}_2 ∧  b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨  b^{216, 5}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-22241 -22242  22243  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{216, 5}_2 ∧ -b^{216, 5}_1 ∧ -b^{216, 5}_0 ∧ true) 
c  in CNF:
c    -b^{216, 5}_2 ∨  b^{216, 5}_1 ∨  b^{216, 5}_0 ∨ false 
c  in DIMACS:
-22241  22242  22243  0

c  3 does not represent an automaton state.
c    -(-b^{216, 5}_2 ∧  b^{216, 5}_1 ∧  b^{216, 5}_0 ∧ true) 
c  in CNF:
c     b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ false 
c  in DIMACS:
 22241 -22242 -22243  0
c  -3 does not represent an automaton state.
c    -( b^{216, 5}_2 ∧  b^{216, 5}_1 ∧  b^{216, 5}_0 ∧ true) 
c  in CNF:
c    -b^{216, 5}_2 ∨ -b^{216, 5}_1 ∨ -b^{216, 5}_0 ∨ false 
c  in DIMACS:
-22241 -22242 -22243  0

c INIT for k = 217
c    -b^{217, 1}_2
c    -b^{217, 1}_1
c    -b^{217, 1}_0
c  in DIMACS:
-22247 0
-22248 0
-22249 0

c Transitions for k = 217
c i = 1
c  -2+1 --> -1
c    ( b^{217, 1}_2 ∧  b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧  p_217) -> ( b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0)
c  in CNF:
c    -b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨  b^{217, 2}_2
c    -b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_1
c    -b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨  b^{217, 2}_0
c  in DIMACS:
-22247 -22248  22249 -217  22250 0
-22247 -22248  22249 -217 -22251 0
-22247 -22248  22249 -217  22252 0

c  -1+1 --> 0
c    ( b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧  b^{217, 1}_0 ∧  p_217) -> (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧ -b^{217, 2}_0)
c  in CNF:
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_2
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_1
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_0
c  in DIMACS:
-22247  22248 -22249 -217 -22250 0
-22247  22248 -22249 -217 -22251 0
-22247  22248 -22249 -217 -22252 0

c  0+1 --> 1
c    (-b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧  p_217) -> (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0)
c  in CNF:
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_2
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_1
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨  b^{217, 2}_0
c  in DIMACS:
 22247  22248  22249 -217 -22250 0
 22247  22248  22249 -217 -22251 0
 22247  22248  22249 -217  22252 0

c  1+1 --> 2
c    (-b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧  b^{217, 1}_0 ∧  p_217) -> (-b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0)
c  in CNF:
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_2
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨  b^{217, 2}_1
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ -p_217 ∨ -b^{217, 2}_0
c  in DIMACS:
 22247  22248 -22249 -217 -22250 0
 22247  22248 -22249 -217  22251 0
 22247  22248 -22249 -217 -22252 0

c  2+1 --> break 
c    (-b^{217, 1}_2 ∧  b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧  p_217) -> break
c  in CNF:
c     b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ -p_217 ∨ break
c  in DIMACS:
 22247 -22248  22249 -217 1162 0


c  2-1 --> 1
c    (-b^{217, 1}_2 ∧  b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧ -p_217) -> (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0)
c  in CNF:
c     b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_2
c     b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_1
c     b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨  b^{217, 2}_0
c  in DIMACS:
 22247 -22248  22249  217 -22250 0
 22247 -22248  22249  217 -22251 0
 22247 -22248  22249  217  22252 0

c  1-1 --> 0
c    (-b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧  b^{217, 1}_0 ∧ -p_217) -> (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧ -b^{217, 2}_0)
c  in CNF:
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_2
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_1
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_0
c  in DIMACS:
 22247  22248 -22249  217 -22250 0
 22247  22248 -22249  217 -22251 0
 22247  22248 -22249  217 -22252 0

c  0-1 --> -1
c    (-b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧ -p_217) -> ( b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0)
c  in CNF:
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨  b^{217, 2}_2
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_1
c     b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨  b^{217, 2}_0
c  in DIMACS:
 22247  22248  22249  217  22250 0
 22247  22248  22249  217 -22251 0
 22247  22248  22249  217  22252 0

c  -1-1 --> -2
c    ( b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧  b^{217, 1}_0 ∧ -p_217) -> ( b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0)
c  in CNF:
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨  b^{217, 2}_2
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨  b^{217, 2}_1
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨  p_217 ∨ -b^{217, 2}_0
c  in DIMACS:
-22247  22248 -22249  217  22250 0
-22247  22248 -22249  217  22251 0
-22247  22248 -22249  217 -22252 0

c  -2-1 --> break 
c    ( b^{217, 1}_2 ∧  b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧ -p_217) -> break
c  in CNF:
c    -b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨  b^{217, 1}_0 ∨  p_217 ∨ break
c  in DIMACS:
-22247 -22248  22249  217 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{217, 1}_2 ∧ -b^{217, 1}_1 ∧ -b^{217, 1}_0 ∧ true) 
c  in CNF:
c    -b^{217, 1}_2 ∨  b^{217, 1}_1 ∨  b^{217, 1}_0 ∨ false 
c  in DIMACS:
-22247  22248  22249  0

c  3 does not represent an automaton state.
c    -(-b^{217, 1}_2 ∧  b^{217, 1}_1 ∧  b^{217, 1}_0 ∧ true) 
c  in CNF:
c     b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ false 
c  in DIMACS:
 22247 -22248 -22249  0
c  -3 does not represent an automaton state.
c    -( b^{217, 1}_2 ∧  b^{217, 1}_1 ∧  b^{217, 1}_0 ∧ true) 
c  in CNF:
c    -b^{217, 1}_2 ∨ -b^{217, 1}_1 ∨ -b^{217, 1}_0 ∨ false 
c  in DIMACS:
-22247 -22248 -22249  0

c i = 2
c  -2+1 --> -1
c    ( b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧  p_434) -> ( b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0)
c  in CNF:
c    -b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨  b^{217, 3}_2
c    -b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_1
c    -b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨  b^{217, 3}_0
c  in DIMACS:
-22250 -22251  22252 -434  22253 0
-22250 -22251  22252 -434 -22254 0
-22250 -22251  22252 -434  22255 0

c  -1+1 --> 0
c    ( b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0 ∧  p_434) -> (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧ -b^{217, 3}_0)
c  in CNF:
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_2
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_1
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_0
c  in DIMACS:
-22250  22251 -22252 -434 -22253 0
-22250  22251 -22252 -434 -22254 0
-22250  22251 -22252 -434 -22255 0

c  0+1 --> 1
c    (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧  p_434) -> (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0)
c  in CNF:
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_2
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_1
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨  b^{217, 3}_0
c  in DIMACS:
 22250  22251  22252 -434 -22253 0
 22250  22251  22252 -434 -22254 0
 22250  22251  22252 -434  22255 0

c  1+1 --> 2
c    (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0 ∧  p_434) -> (-b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0)
c  in CNF:
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_2
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨  b^{217, 3}_1
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ -p_434 ∨ -b^{217, 3}_0
c  in DIMACS:
 22250  22251 -22252 -434 -22253 0
 22250  22251 -22252 -434  22254 0
 22250  22251 -22252 -434 -22255 0

c  2+1 --> break 
c    (-b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧  p_434) -> break
c  in CNF:
c     b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ -p_434 ∨ break
c  in DIMACS:
 22250 -22251  22252 -434 1162 0


c  2-1 --> 1
c    (-b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧ -p_434) -> (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0)
c  in CNF:
c     b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_2
c     b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_1
c     b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨  b^{217, 3}_0
c  in DIMACS:
 22250 -22251  22252  434 -22253 0
 22250 -22251  22252  434 -22254 0
 22250 -22251  22252  434  22255 0

c  1-1 --> 0
c    (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0 ∧ -p_434) -> (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧ -b^{217, 3}_0)
c  in CNF:
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_2
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_1
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_0
c  in DIMACS:
 22250  22251 -22252  434 -22253 0
 22250  22251 -22252  434 -22254 0
 22250  22251 -22252  434 -22255 0

c  0-1 --> -1
c    (-b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧ -p_434) -> ( b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0)
c  in CNF:
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨  b^{217, 3}_2
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_1
c     b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨  b^{217, 3}_0
c  in DIMACS:
 22250  22251  22252  434  22253 0
 22250  22251  22252  434 -22254 0
 22250  22251  22252  434  22255 0

c  -1-1 --> -2
c    ( b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧  b^{217, 2}_0 ∧ -p_434) -> ( b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0)
c  in CNF:
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨  b^{217, 3}_2
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨  b^{217, 3}_1
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨  p_434 ∨ -b^{217, 3}_0
c  in DIMACS:
-22250  22251 -22252  434  22253 0
-22250  22251 -22252  434  22254 0
-22250  22251 -22252  434 -22255 0

c  -2-1 --> break 
c    ( b^{217, 2}_2 ∧  b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧ -p_434) -> break
c  in CNF:
c    -b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨  b^{217, 2}_0 ∨  p_434 ∨ break
c  in DIMACS:
-22250 -22251  22252  434 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{217, 2}_2 ∧ -b^{217, 2}_1 ∧ -b^{217, 2}_0 ∧ true) 
c  in CNF:
c    -b^{217, 2}_2 ∨  b^{217, 2}_1 ∨  b^{217, 2}_0 ∨ false 
c  in DIMACS:
-22250  22251  22252  0

c  3 does not represent an automaton state.
c    -(-b^{217, 2}_2 ∧  b^{217, 2}_1 ∧  b^{217, 2}_0 ∧ true) 
c  in CNF:
c     b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ false 
c  in DIMACS:
 22250 -22251 -22252  0
c  -3 does not represent an automaton state.
c    -( b^{217, 2}_2 ∧  b^{217, 2}_1 ∧  b^{217, 2}_0 ∧ true) 
c  in CNF:
c    -b^{217, 2}_2 ∨ -b^{217, 2}_1 ∨ -b^{217, 2}_0 ∨ false 
c  in DIMACS:
-22250 -22251 -22252  0

c i = 3
c  -2+1 --> -1
c    ( b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧  p_651) -> ( b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0)
c  in CNF:
c    -b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨  b^{217, 4}_2
c    -b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_1
c    -b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨  b^{217, 4}_0
c  in DIMACS:
-22253 -22254  22255 -651  22256 0
-22253 -22254  22255 -651 -22257 0
-22253 -22254  22255 -651  22258 0

c  -1+1 --> 0
c    ( b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0 ∧  p_651) -> (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧ -b^{217, 4}_0)
c  in CNF:
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_2
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_1
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_0
c  in DIMACS:
-22253  22254 -22255 -651 -22256 0
-22253  22254 -22255 -651 -22257 0
-22253  22254 -22255 -651 -22258 0

c  0+1 --> 1
c    (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧  p_651) -> (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0)
c  in CNF:
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_2
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_1
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨  b^{217, 4}_0
c  in DIMACS:
 22253  22254  22255 -651 -22256 0
 22253  22254  22255 -651 -22257 0
 22253  22254  22255 -651  22258 0

c  1+1 --> 2
c    (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0 ∧  p_651) -> (-b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0)
c  in CNF:
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_2
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨  b^{217, 4}_1
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ -p_651 ∨ -b^{217, 4}_0
c  in DIMACS:
 22253  22254 -22255 -651 -22256 0
 22253  22254 -22255 -651  22257 0
 22253  22254 -22255 -651 -22258 0

c  2+1 --> break 
c    (-b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧  p_651) -> break
c  in CNF:
c     b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ -p_651 ∨ break
c  in DIMACS:
 22253 -22254  22255 -651 1162 0


c  2-1 --> 1
c    (-b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧ -p_651) -> (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0)
c  in CNF:
c     b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_2
c     b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_1
c     b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨  b^{217, 4}_0
c  in DIMACS:
 22253 -22254  22255  651 -22256 0
 22253 -22254  22255  651 -22257 0
 22253 -22254  22255  651  22258 0

c  1-1 --> 0
c    (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0 ∧ -p_651) -> (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧ -b^{217, 4}_0)
c  in CNF:
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_2
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_1
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_0
c  in DIMACS:
 22253  22254 -22255  651 -22256 0
 22253  22254 -22255  651 -22257 0
 22253  22254 -22255  651 -22258 0

c  0-1 --> -1
c    (-b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧ -p_651) -> ( b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0)
c  in CNF:
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨  b^{217, 4}_2
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_1
c     b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨  b^{217, 4}_0
c  in DIMACS:
 22253  22254  22255  651  22256 0
 22253  22254  22255  651 -22257 0
 22253  22254  22255  651  22258 0

c  -1-1 --> -2
c    ( b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧  b^{217, 3}_0 ∧ -p_651) -> ( b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0)
c  in CNF:
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨  b^{217, 4}_2
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨  b^{217, 4}_1
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨  p_651 ∨ -b^{217, 4}_0
c  in DIMACS:
-22253  22254 -22255  651  22256 0
-22253  22254 -22255  651  22257 0
-22253  22254 -22255  651 -22258 0

c  -2-1 --> break 
c    ( b^{217, 3}_2 ∧  b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧ -p_651) -> break
c  in CNF:
c    -b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨  b^{217, 3}_0 ∨  p_651 ∨ break
c  in DIMACS:
-22253 -22254  22255  651 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{217, 3}_2 ∧ -b^{217, 3}_1 ∧ -b^{217, 3}_0 ∧ true) 
c  in CNF:
c    -b^{217, 3}_2 ∨  b^{217, 3}_1 ∨  b^{217, 3}_0 ∨ false 
c  in DIMACS:
-22253  22254  22255  0

c  3 does not represent an automaton state.
c    -(-b^{217, 3}_2 ∧  b^{217, 3}_1 ∧  b^{217, 3}_0 ∧ true) 
c  in CNF:
c     b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ false 
c  in DIMACS:
 22253 -22254 -22255  0
c  -3 does not represent an automaton state.
c    -( b^{217, 3}_2 ∧  b^{217, 3}_1 ∧  b^{217, 3}_0 ∧ true) 
c  in CNF:
c    -b^{217, 3}_2 ∨ -b^{217, 3}_1 ∨ -b^{217, 3}_0 ∨ false 
c  in DIMACS:
-22253 -22254 -22255  0

c i = 4
c  -2+1 --> -1
c    ( b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧  p_868) -> ( b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0)
c  in CNF:
c    -b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨  b^{217, 5}_2
c    -b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_1
c    -b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨  b^{217, 5}_0
c  in DIMACS:
-22256 -22257  22258 -868  22259 0
-22256 -22257  22258 -868 -22260 0
-22256 -22257  22258 -868  22261 0

c  -1+1 --> 0
c    ( b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0 ∧  p_868) -> (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧ -b^{217, 5}_0)
c  in CNF:
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_2
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_1
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_0
c  in DIMACS:
-22256  22257 -22258 -868 -22259 0
-22256  22257 -22258 -868 -22260 0
-22256  22257 -22258 -868 -22261 0

c  0+1 --> 1
c    (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧  p_868) -> (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0)
c  in CNF:
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_2
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_1
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨  b^{217, 5}_0
c  in DIMACS:
 22256  22257  22258 -868 -22259 0
 22256  22257  22258 -868 -22260 0
 22256  22257  22258 -868  22261 0

c  1+1 --> 2
c    (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0 ∧  p_868) -> (-b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0)
c  in CNF:
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_2
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨  b^{217, 5}_1
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ -p_868 ∨ -b^{217, 5}_0
c  in DIMACS:
 22256  22257 -22258 -868 -22259 0
 22256  22257 -22258 -868  22260 0
 22256  22257 -22258 -868 -22261 0

c  2+1 --> break 
c    (-b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧  p_868) -> break
c  in CNF:
c     b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ -p_868 ∨ break
c  in DIMACS:
 22256 -22257  22258 -868 1162 0


c  2-1 --> 1
c    (-b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧ -p_868) -> (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0)
c  in CNF:
c     b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_2
c     b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_1
c     b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨  b^{217, 5}_0
c  in DIMACS:
 22256 -22257  22258  868 -22259 0
 22256 -22257  22258  868 -22260 0
 22256 -22257  22258  868  22261 0

c  1-1 --> 0
c    (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0 ∧ -p_868) -> (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧ -b^{217, 5}_0)
c  in CNF:
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_2
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_1
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_0
c  in DIMACS:
 22256  22257 -22258  868 -22259 0
 22256  22257 -22258  868 -22260 0
 22256  22257 -22258  868 -22261 0

c  0-1 --> -1
c    (-b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧ -p_868) -> ( b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0)
c  in CNF:
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨  b^{217, 5}_2
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_1
c     b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨  b^{217, 5}_0
c  in DIMACS:
 22256  22257  22258  868  22259 0
 22256  22257  22258  868 -22260 0
 22256  22257  22258  868  22261 0

c  -1-1 --> -2
c    ( b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧  b^{217, 4}_0 ∧ -p_868) -> ( b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0)
c  in CNF:
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨  b^{217, 5}_2
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨  b^{217, 5}_1
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨  p_868 ∨ -b^{217, 5}_0
c  in DIMACS:
-22256  22257 -22258  868  22259 0
-22256  22257 -22258  868  22260 0
-22256  22257 -22258  868 -22261 0

c  -2-1 --> break 
c    ( b^{217, 4}_2 ∧  b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧ -p_868) -> break
c  in CNF:
c    -b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨  b^{217, 4}_0 ∨  p_868 ∨ break
c  in DIMACS:
-22256 -22257  22258  868 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{217, 4}_2 ∧ -b^{217, 4}_1 ∧ -b^{217, 4}_0 ∧ true) 
c  in CNF:
c    -b^{217, 4}_2 ∨  b^{217, 4}_1 ∨  b^{217, 4}_0 ∨ false 
c  in DIMACS:
-22256  22257  22258  0

c  3 does not represent an automaton state.
c    -(-b^{217, 4}_2 ∧  b^{217, 4}_1 ∧  b^{217, 4}_0 ∧ true) 
c  in CNF:
c     b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ false 
c  in DIMACS:
 22256 -22257 -22258  0
c  -3 does not represent an automaton state.
c    -( b^{217, 4}_2 ∧  b^{217, 4}_1 ∧  b^{217, 4}_0 ∧ true) 
c  in CNF:
c    -b^{217, 4}_2 ∨ -b^{217, 4}_1 ∨ -b^{217, 4}_0 ∨ false 
c  in DIMACS:
-22256 -22257 -22258  0

c i = 5
c  -2+1 --> -1
c    ( b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧  p_1085) -> ( b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧  b^{217, 6}_0)
c  in CNF:
c    -b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨  b^{217, 6}_2
c    -b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_1
c    -b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨  b^{217, 6}_0
c  in DIMACS:
-22259 -22260  22261 -1085  22262 0
-22259 -22260  22261 -1085 -22263 0
-22259 -22260  22261 -1085  22264 0

c  -1+1 --> 0
c    ( b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0 ∧  p_1085) -> (-b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧ -b^{217, 6}_0)
c  in CNF:
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_2
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_1
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_0
c  in DIMACS:
-22259  22260 -22261 -1085 -22262 0
-22259  22260 -22261 -1085 -22263 0
-22259  22260 -22261 -1085 -22264 0

c  0+1 --> 1
c    (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧  p_1085) -> (-b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧  b^{217, 6}_0)
c  in CNF:
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_2
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_1
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨  b^{217, 6}_0
c  in DIMACS:
 22259  22260  22261 -1085 -22262 0
 22259  22260  22261 -1085 -22263 0
 22259  22260  22261 -1085  22264 0

c  1+1 --> 2
c    (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0 ∧  p_1085) -> (-b^{217, 6}_2 ∧  b^{217, 6}_1 ∧ -b^{217, 6}_0)
c  in CNF:
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_2
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨  b^{217, 6}_1
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ -p_1085 ∨ -b^{217, 6}_0
c  in DIMACS:
 22259  22260 -22261 -1085 -22262 0
 22259  22260 -22261 -1085  22263 0
 22259  22260 -22261 -1085 -22264 0

c  2+1 --> break 
c    (-b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧  p_1085) -> break
c  in CNF:
c     b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ -p_1085 ∨ break
c  in DIMACS:
 22259 -22260  22261 -1085 1162 0


c  2-1 --> 1
c    (-b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧ -p_1085) -> (-b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧  b^{217, 6}_0)
c  in CNF:
c     b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_2
c     b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_1
c     b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨  b^{217, 6}_0
c  in DIMACS:
 22259 -22260  22261  1085 -22262 0
 22259 -22260  22261  1085 -22263 0
 22259 -22260  22261  1085  22264 0

c  1-1 --> 0
c    (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0 ∧ -p_1085) -> (-b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧ -b^{217, 6}_0)
c  in CNF:
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_2
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_1
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_0
c  in DIMACS:
 22259  22260 -22261  1085 -22262 0
 22259  22260 -22261  1085 -22263 0
 22259  22260 -22261  1085 -22264 0

c  0-1 --> -1
c    (-b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧ -p_1085) -> ( b^{217, 6}_2 ∧ -b^{217, 6}_1 ∧  b^{217, 6}_0)
c  in CNF:
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨  b^{217, 6}_2
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_1
c     b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨  b^{217, 6}_0
c  in DIMACS:
 22259  22260  22261  1085  22262 0
 22259  22260  22261  1085 -22263 0
 22259  22260  22261  1085  22264 0

c  -1-1 --> -2
c    ( b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧  b^{217, 5}_0 ∧ -p_1085) -> ( b^{217, 6}_2 ∧  b^{217, 6}_1 ∧ -b^{217, 6}_0)
c  in CNF:
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨  b^{217, 6}_2
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨  b^{217, 6}_1
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨  p_1085 ∨ -b^{217, 6}_0
c  in DIMACS:
-22259  22260 -22261  1085  22262 0
-22259  22260 -22261  1085  22263 0
-22259  22260 -22261  1085 -22264 0

c  -2-1 --> break 
c    ( b^{217, 5}_2 ∧  b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧ -p_1085) -> break
c  in CNF:
c    -b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨  b^{217, 5}_0 ∨  p_1085 ∨ break
c  in DIMACS:
-22259 -22260  22261  1085 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{217, 5}_2 ∧ -b^{217, 5}_1 ∧ -b^{217, 5}_0 ∧ true) 
c  in CNF:
c    -b^{217, 5}_2 ∨  b^{217, 5}_1 ∨  b^{217, 5}_0 ∨ false 
c  in DIMACS:
-22259  22260  22261  0

c  3 does not represent an automaton state.
c    -(-b^{217, 5}_2 ∧  b^{217, 5}_1 ∧  b^{217, 5}_0 ∧ true) 
c  in CNF:
c     b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ false 
c  in DIMACS:
 22259 -22260 -22261  0
c  -3 does not represent an automaton state.
c    -( b^{217, 5}_2 ∧  b^{217, 5}_1 ∧  b^{217, 5}_0 ∧ true) 
c  in CNF:
c    -b^{217, 5}_2 ∨ -b^{217, 5}_1 ∨ -b^{217, 5}_0 ∨ false 
c  in DIMACS:
-22259 -22260 -22261  0

c INIT for k = 218
c    -b^{218, 1}_2
c    -b^{218, 1}_1
c    -b^{218, 1}_0
c  in DIMACS:
-22265 0
-22266 0
-22267 0

c Transitions for k = 218
c i = 1
c  -2+1 --> -1
c    ( b^{218, 1}_2 ∧  b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧  p_218) -> ( b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0)
c  in CNF:
c    -b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨  b^{218, 2}_2
c    -b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_1
c    -b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨  b^{218, 2}_0
c  in DIMACS:
-22265 -22266  22267 -218  22268 0
-22265 -22266  22267 -218 -22269 0
-22265 -22266  22267 -218  22270 0

c  -1+1 --> 0
c    ( b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧  b^{218, 1}_0 ∧  p_218) -> (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧ -b^{218, 2}_0)
c  in CNF:
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_2
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_1
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_0
c  in DIMACS:
-22265  22266 -22267 -218 -22268 0
-22265  22266 -22267 -218 -22269 0
-22265  22266 -22267 -218 -22270 0

c  0+1 --> 1
c    (-b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧  p_218) -> (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0)
c  in CNF:
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_2
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_1
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨  b^{218, 2}_0
c  in DIMACS:
 22265  22266  22267 -218 -22268 0
 22265  22266  22267 -218 -22269 0
 22265  22266  22267 -218  22270 0

c  1+1 --> 2
c    (-b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧  b^{218, 1}_0 ∧  p_218) -> (-b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0)
c  in CNF:
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_2
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨  b^{218, 2}_1
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ -p_218 ∨ -b^{218, 2}_0
c  in DIMACS:
 22265  22266 -22267 -218 -22268 0
 22265  22266 -22267 -218  22269 0
 22265  22266 -22267 -218 -22270 0

c  2+1 --> break 
c    (-b^{218, 1}_2 ∧  b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧  p_218) -> break
c  in CNF:
c     b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ -p_218 ∨ break
c  in DIMACS:
 22265 -22266  22267 -218 1162 0


c  2-1 --> 1
c    (-b^{218, 1}_2 ∧  b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧ -p_218) -> (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0)
c  in CNF:
c     b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_2
c     b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_1
c     b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨  b^{218, 2}_0
c  in DIMACS:
 22265 -22266  22267  218 -22268 0
 22265 -22266  22267  218 -22269 0
 22265 -22266  22267  218  22270 0

c  1-1 --> 0
c    (-b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧  b^{218, 1}_0 ∧ -p_218) -> (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧ -b^{218, 2}_0)
c  in CNF:
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_2
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_1
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_0
c  in DIMACS:
 22265  22266 -22267  218 -22268 0
 22265  22266 -22267  218 -22269 0
 22265  22266 -22267  218 -22270 0

c  0-1 --> -1
c    (-b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧ -p_218) -> ( b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0)
c  in CNF:
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨  b^{218, 2}_2
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_1
c     b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨  b^{218, 2}_0
c  in DIMACS:
 22265  22266  22267  218  22268 0
 22265  22266  22267  218 -22269 0
 22265  22266  22267  218  22270 0

c  -1-1 --> -2
c    ( b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧  b^{218, 1}_0 ∧ -p_218) -> ( b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0)
c  in CNF:
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨  b^{218, 2}_2
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨  b^{218, 2}_1
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨  p_218 ∨ -b^{218, 2}_0
c  in DIMACS:
-22265  22266 -22267  218  22268 0
-22265  22266 -22267  218  22269 0
-22265  22266 -22267  218 -22270 0

c  -2-1 --> break 
c    ( b^{218, 1}_2 ∧  b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧ -p_218) -> break
c  in CNF:
c    -b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨  b^{218, 1}_0 ∨  p_218 ∨ break
c  in DIMACS:
-22265 -22266  22267  218 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{218, 1}_2 ∧ -b^{218, 1}_1 ∧ -b^{218, 1}_0 ∧ true) 
c  in CNF:
c    -b^{218, 1}_2 ∨  b^{218, 1}_1 ∨  b^{218, 1}_0 ∨ false 
c  in DIMACS:
-22265  22266  22267  0

c  3 does not represent an automaton state.
c    -(-b^{218, 1}_2 ∧  b^{218, 1}_1 ∧  b^{218, 1}_0 ∧ true) 
c  in CNF:
c     b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ false 
c  in DIMACS:
 22265 -22266 -22267  0
c  -3 does not represent an automaton state.
c    -( b^{218, 1}_2 ∧  b^{218, 1}_1 ∧  b^{218, 1}_0 ∧ true) 
c  in CNF:
c    -b^{218, 1}_2 ∨ -b^{218, 1}_1 ∨ -b^{218, 1}_0 ∨ false 
c  in DIMACS:
-22265 -22266 -22267  0

c i = 2
c  -2+1 --> -1
c    ( b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧  p_436) -> ( b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0)
c  in CNF:
c    -b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨  b^{218, 3}_2
c    -b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_1
c    -b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨  b^{218, 3}_0
c  in DIMACS:
-22268 -22269  22270 -436  22271 0
-22268 -22269  22270 -436 -22272 0
-22268 -22269  22270 -436  22273 0

c  -1+1 --> 0
c    ( b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0 ∧  p_436) -> (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧ -b^{218, 3}_0)
c  in CNF:
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_2
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_1
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_0
c  in DIMACS:
-22268  22269 -22270 -436 -22271 0
-22268  22269 -22270 -436 -22272 0
-22268  22269 -22270 -436 -22273 0

c  0+1 --> 1
c    (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧  p_436) -> (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0)
c  in CNF:
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_2
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_1
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨  b^{218, 3}_0
c  in DIMACS:
 22268  22269  22270 -436 -22271 0
 22268  22269  22270 -436 -22272 0
 22268  22269  22270 -436  22273 0

c  1+1 --> 2
c    (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0 ∧  p_436) -> (-b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0)
c  in CNF:
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_2
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨  b^{218, 3}_1
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ -p_436 ∨ -b^{218, 3}_0
c  in DIMACS:
 22268  22269 -22270 -436 -22271 0
 22268  22269 -22270 -436  22272 0
 22268  22269 -22270 -436 -22273 0

c  2+1 --> break 
c    (-b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧  p_436) -> break
c  in CNF:
c     b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ -p_436 ∨ break
c  in DIMACS:
 22268 -22269  22270 -436 1162 0


c  2-1 --> 1
c    (-b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧ -p_436) -> (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0)
c  in CNF:
c     b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_2
c     b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_1
c     b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨  b^{218, 3}_0
c  in DIMACS:
 22268 -22269  22270  436 -22271 0
 22268 -22269  22270  436 -22272 0
 22268 -22269  22270  436  22273 0

c  1-1 --> 0
c    (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0 ∧ -p_436) -> (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧ -b^{218, 3}_0)
c  in CNF:
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_2
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_1
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_0
c  in DIMACS:
 22268  22269 -22270  436 -22271 0
 22268  22269 -22270  436 -22272 0
 22268  22269 -22270  436 -22273 0

c  0-1 --> -1
c    (-b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧ -p_436) -> ( b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0)
c  in CNF:
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨  b^{218, 3}_2
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_1
c     b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨  b^{218, 3}_0
c  in DIMACS:
 22268  22269  22270  436  22271 0
 22268  22269  22270  436 -22272 0
 22268  22269  22270  436  22273 0

c  -1-1 --> -2
c    ( b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧  b^{218, 2}_0 ∧ -p_436) -> ( b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0)
c  in CNF:
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨  b^{218, 3}_2
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨  b^{218, 3}_1
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨  p_436 ∨ -b^{218, 3}_0
c  in DIMACS:
-22268  22269 -22270  436  22271 0
-22268  22269 -22270  436  22272 0
-22268  22269 -22270  436 -22273 0

c  -2-1 --> break 
c    ( b^{218, 2}_2 ∧  b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧ -p_436) -> break
c  in CNF:
c    -b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨  b^{218, 2}_0 ∨  p_436 ∨ break
c  in DIMACS:
-22268 -22269  22270  436 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{218, 2}_2 ∧ -b^{218, 2}_1 ∧ -b^{218, 2}_0 ∧ true) 
c  in CNF:
c    -b^{218, 2}_2 ∨  b^{218, 2}_1 ∨  b^{218, 2}_0 ∨ false 
c  in DIMACS:
-22268  22269  22270  0

c  3 does not represent an automaton state.
c    -(-b^{218, 2}_2 ∧  b^{218, 2}_1 ∧  b^{218, 2}_0 ∧ true) 
c  in CNF:
c     b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ false 
c  in DIMACS:
 22268 -22269 -22270  0
c  -3 does not represent an automaton state.
c    -( b^{218, 2}_2 ∧  b^{218, 2}_1 ∧  b^{218, 2}_0 ∧ true) 
c  in CNF:
c    -b^{218, 2}_2 ∨ -b^{218, 2}_1 ∨ -b^{218, 2}_0 ∨ false 
c  in DIMACS:
-22268 -22269 -22270  0

c i = 3
c  -2+1 --> -1
c    ( b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧  p_654) -> ( b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0)
c  in CNF:
c    -b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨  b^{218, 4}_2
c    -b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_1
c    -b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨  b^{218, 4}_0
c  in DIMACS:
-22271 -22272  22273 -654  22274 0
-22271 -22272  22273 -654 -22275 0
-22271 -22272  22273 -654  22276 0

c  -1+1 --> 0
c    ( b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0 ∧  p_654) -> (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧ -b^{218, 4}_0)
c  in CNF:
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_2
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_1
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_0
c  in DIMACS:
-22271  22272 -22273 -654 -22274 0
-22271  22272 -22273 -654 -22275 0
-22271  22272 -22273 -654 -22276 0

c  0+1 --> 1
c    (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧  p_654) -> (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0)
c  in CNF:
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_2
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_1
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨  b^{218, 4}_0
c  in DIMACS:
 22271  22272  22273 -654 -22274 0
 22271  22272  22273 -654 -22275 0
 22271  22272  22273 -654  22276 0

c  1+1 --> 2
c    (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0 ∧  p_654) -> (-b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0)
c  in CNF:
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_2
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨  b^{218, 4}_1
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ -p_654 ∨ -b^{218, 4}_0
c  in DIMACS:
 22271  22272 -22273 -654 -22274 0
 22271  22272 -22273 -654  22275 0
 22271  22272 -22273 -654 -22276 0

c  2+1 --> break 
c    (-b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧  p_654) -> break
c  in CNF:
c     b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 22271 -22272  22273 -654 1162 0


c  2-1 --> 1
c    (-b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧ -p_654) -> (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0)
c  in CNF:
c     b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_2
c     b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_1
c     b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨  b^{218, 4}_0
c  in DIMACS:
 22271 -22272  22273  654 -22274 0
 22271 -22272  22273  654 -22275 0
 22271 -22272  22273  654  22276 0

c  1-1 --> 0
c    (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0 ∧ -p_654) -> (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧ -b^{218, 4}_0)
c  in CNF:
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_2
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_1
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_0
c  in DIMACS:
 22271  22272 -22273  654 -22274 0
 22271  22272 -22273  654 -22275 0
 22271  22272 -22273  654 -22276 0

c  0-1 --> -1
c    (-b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧ -p_654) -> ( b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0)
c  in CNF:
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨  b^{218, 4}_2
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_1
c     b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨  b^{218, 4}_0
c  in DIMACS:
 22271  22272  22273  654  22274 0
 22271  22272  22273  654 -22275 0
 22271  22272  22273  654  22276 0

c  -1-1 --> -2
c    ( b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧  b^{218, 3}_0 ∧ -p_654) -> ( b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0)
c  in CNF:
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨  b^{218, 4}_2
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨  b^{218, 4}_1
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨  p_654 ∨ -b^{218, 4}_0
c  in DIMACS:
-22271  22272 -22273  654  22274 0
-22271  22272 -22273  654  22275 0
-22271  22272 -22273  654 -22276 0

c  -2-1 --> break 
c    ( b^{218, 3}_2 ∧  b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨  b^{218, 3}_0 ∨  p_654 ∨ break
c  in DIMACS:
-22271 -22272  22273  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{218, 3}_2 ∧ -b^{218, 3}_1 ∧ -b^{218, 3}_0 ∧ true) 
c  in CNF:
c    -b^{218, 3}_2 ∨  b^{218, 3}_1 ∨  b^{218, 3}_0 ∨ false 
c  in DIMACS:
-22271  22272  22273  0

c  3 does not represent an automaton state.
c    -(-b^{218, 3}_2 ∧  b^{218, 3}_1 ∧  b^{218, 3}_0 ∧ true) 
c  in CNF:
c     b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ false 
c  in DIMACS:
 22271 -22272 -22273  0
c  -3 does not represent an automaton state.
c    -( b^{218, 3}_2 ∧  b^{218, 3}_1 ∧  b^{218, 3}_0 ∧ true) 
c  in CNF:
c    -b^{218, 3}_2 ∨ -b^{218, 3}_1 ∨ -b^{218, 3}_0 ∨ false 
c  in DIMACS:
-22271 -22272 -22273  0

c i = 4
c  -2+1 --> -1
c    ( b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧  p_872) -> ( b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0)
c  in CNF:
c    -b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨  b^{218, 5}_2
c    -b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_1
c    -b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨  b^{218, 5}_0
c  in DIMACS:
-22274 -22275  22276 -872  22277 0
-22274 -22275  22276 -872 -22278 0
-22274 -22275  22276 -872  22279 0

c  -1+1 --> 0
c    ( b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0 ∧  p_872) -> (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧ -b^{218, 5}_0)
c  in CNF:
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_2
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_1
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_0
c  in DIMACS:
-22274  22275 -22276 -872 -22277 0
-22274  22275 -22276 -872 -22278 0
-22274  22275 -22276 -872 -22279 0

c  0+1 --> 1
c    (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧  p_872) -> (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0)
c  in CNF:
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_2
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_1
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨  b^{218, 5}_0
c  in DIMACS:
 22274  22275  22276 -872 -22277 0
 22274  22275  22276 -872 -22278 0
 22274  22275  22276 -872  22279 0

c  1+1 --> 2
c    (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0 ∧  p_872) -> (-b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0)
c  in CNF:
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_2
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨  b^{218, 5}_1
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ -p_872 ∨ -b^{218, 5}_0
c  in DIMACS:
 22274  22275 -22276 -872 -22277 0
 22274  22275 -22276 -872  22278 0
 22274  22275 -22276 -872 -22279 0

c  2+1 --> break 
c    (-b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧  p_872) -> break
c  in CNF:
c     b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ -p_872 ∨ break
c  in DIMACS:
 22274 -22275  22276 -872 1162 0


c  2-1 --> 1
c    (-b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧ -p_872) -> (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0)
c  in CNF:
c     b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_2
c     b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_1
c     b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨  b^{218, 5}_0
c  in DIMACS:
 22274 -22275  22276  872 -22277 0
 22274 -22275  22276  872 -22278 0
 22274 -22275  22276  872  22279 0

c  1-1 --> 0
c    (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0 ∧ -p_872) -> (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧ -b^{218, 5}_0)
c  in CNF:
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_2
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_1
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_0
c  in DIMACS:
 22274  22275 -22276  872 -22277 0
 22274  22275 -22276  872 -22278 0
 22274  22275 -22276  872 -22279 0

c  0-1 --> -1
c    (-b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧ -p_872) -> ( b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0)
c  in CNF:
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨  b^{218, 5}_2
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_1
c     b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨  b^{218, 5}_0
c  in DIMACS:
 22274  22275  22276  872  22277 0
 22274  22275  22276  872 -22278 0
 22274  22275  22276  872  22279 0

c  -1-1 --> -2
c    ( b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧  b^{218, 4}_0 ∧ -p_872) -> ( b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0)
c  in CNF:
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨  b^{218, 5}_2
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨  b^{218, 5}_1
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨  p_872 ∨ -b^{218, 5}_0
c  in DIMACS:
-22274  22275 -22276  872  22277 0
-22274  22275 -22276  872  22278 0
-22274  22275 -22276  872 -22279 0

c  -2-1 --> break 
c    ( b^{218, 4}_2 ∧  b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧ -p_872) -> break
c  in CNF:
c    -b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨  b^{218, 4}_0 ∨  p_872 ∨ break
c  in DIMACS:
-22274 -22275  22276  872 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{218, 4}_2 ∧ -b^{218, 4}_1 ∧ -b^{218, 4}_0 ∧ true) 
c  in CNF:
c    -b^{218, 4}_2 ∨  b^{218, 4}_1 ∨  b^{218, 4}_0 ∨ false 
c  in DIMACS:
-22274  22275  22276  0

c  3 does not represent an automaton state.
c    -(-b^{218, 4}_2 ∧  b^{218, 4}_1 ∧  b^{218, 4}_0 ∧ true) 
c  in CNF:
c     b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ false 
c  in DIMACS:
 22274 -22275 -22276  0
c  -3 does not represent an automaton state.
c    -( b^{218, 4}_2 ∧  b^{218, 4}_1 ∧  b^{218, 4}_0 ∧ true) 
c  in CNF:
c    -b^{218, 4}_2 ∨ -b^{218, 4}_1 ∨ -b^{218, 4}_0 ∨ false 
c  in DIMACS:
-22274 -22275 -22276  0

c i = 5
c  -2+1 --> -1
c    ( b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧  p_1090) -> ( b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧  b^{218, 6}_0)
c  in CNF:
c    -b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨  b^{218, 6}_2
c    -b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_1
c    -b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨  b^{218, 6}_0
c  in DIMACS:
-22277 -22278  22279 -1090  22280 0
-22277 -22278  22279 -1090 -22281 0
-22277 -22278  22279 -1090  22282 0

c  -1+1 --> 0
c    ( b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0 ∧  p_1090) -> (-b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧ -b^{218, 6}_0)
c  in CNF:
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_2
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_1
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_0
c  in DIMACS:
-22277  22278 -22279 -1090 -22280 0
-22277  22278 -22279 -1090 -22281 0
-22277  22278 -22279 -1090 -22282 0

c  0+1 --> 1
c    (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧  p_1090) -> (-b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧  b^{218, 6}_0)
c  in CNF:
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_2
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_1
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨  b^{218, 6}_0
c  in DIMACS:
 22277  22278  22279 -1090 -22280 0
 22277  22278  22279 -1090 -22281 0
 22277  22278  22279 -1090  22282 0

c  1+1 --> 2
c    (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0 ∧  p_1090) -> (-b^{218, 6}_2 ∧  b^{218, 6}_1 ∧ -b^{218, 6}_0)
c  in CNF:
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_2
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨  b^{218, 6}_1
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ -p_1090 ∨ -b^{218, 6}_0
c  in DIMACS:
 22277  22278 -22279 -1090 -22280 0
 22277  22278 -22279 -1090  22281 0
 22277  22278 -22279 -1090 -22282 0

c  2+1 --> break 
c    (-b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧  p_1090) -> break
c  in CNF:
c     b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ -p_1090 ∨ break
c  in DIMACS:
 22277 -22278  22279 -1090 1162 0


c  2-1 --> 1
c    (-b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧ -p_1090) -> (-b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧  b^{218, 6}_0)
c  in CNF:
c     b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_2
c     b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_1
c     b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨  b^{218, 6}_0
c  in DIMACS:
 22277 -22278  22279  1090 -22280 0
 22277 -22278  22279  1090 -22281 0
 22277 -22278  22279  1090  22282 0

c  1-1 --> 0
c    (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0 ∧ -p_1090) -> (-b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧ -b^{218, 6}_0)
c  in CNF:
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_2
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_1
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_0
c  in DIMACS:
 22277  22278 -22279  1090 -22280 0
 22277  22278 -22279  1090 -22281 0
 22277  22278 -22279  1090 -22282 0

c  0-1 --> -1
c    (-b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧ -p_1090) -> ( b^{218, 6}_2 ∧ -b^{218, 6}_1 ∧  b^{218, 6}_0)
c  in CNF:
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨  b^{218, 6}_2
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_1
c     b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨  b^{218, 6}_0
c  in DIMACS:
 22277  22278  22279  1090  22280 0
 22277  22278  22279  1090 -22281 0
 22277  22278  22279  1090  22282 0

c  -1-1 --> -2
c    ( b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧  b^{218, 5}_0 ∧ -p_1090) -> ( b^{218, 6}_2 ∧  b^{218, 6}_1 ∧ -b^{218, 6}_0)
c  in CNF:
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨  b^{218, 6}_2
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨  b^{218, 6}_1
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨  p_1090 ∨ -b^{218, 6}_0
c  in DIMACS:
-22277  22278 -22279  1090  22280 0
-22277  22278 -22279  1090  22281 0
-22277  22278 -22279  1090 -22282 0

c  -2-1 --> break 
c    ( b^{218, 5}_2 ∧  b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧ -p_1090) -> break
c  in CNF:
c    -b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨  b^{218, 5}_0 ∨  p_1090 ∨ break
c  in DIMACS:
-22277 -22278  22279  1090 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{218, 5}_2 ∧ -b^{218, 5}_1 ∧ -b^{218, 5}_0 ∧ true) 
c  in CNF:
c    -b^{218, 5}_2 ∨  b^{218, 5}_1 ∨  b^{218, 5}_0 ∨ false 
c  in DIMACS:
-22277  22278  22279  0

c  3 does not represent an automaton state.
c    -(-b^{218, 5}_2 ∧  b^{218, 5}_1 ∧  b^{218, 5}_0 ∧ true) 
c  in CNF:
c     b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ false 
c  in DIMACS:
 22277 -22278 -22279  0
c  -3 does not represent an automaton state.
c    -( b^{218, 5}_2 ∧  b^{218, 5}_1 ∧  b^{218, 5}_0 ∧ true) 
c  in CNF:
c    -b^{218, 5}_2 ∨ -b^{218, 5}_1 ∨ -b^{218, 5}_0 ∨ false 
c  in DIMACS:
-22277 -22278 -22279  0

c INIT for k = 219
c    -b^{219, 1}_2
c    -b^{219, 1}_1
c    -b^{219, 1}_0
c  in DIMACS:
-22283 0
-22284 0
-22285 0

c Transitions for k = 219
c i = 1
c  -2+1 --> -1
c    ( b^{219, 1}_2 ∧  b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧  p_219) -> ( b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0)
c  in CNF:
c    -b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨  b^{219, 2}_2
c    -b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_1
c    -b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨  b^{219, 2}_0
c  in DIMACS:
-22283 -22284  22285 -219  22286 0
-22283 -22284  22285 -219 -22287 0
-22283 -22284  22285 -219  22288 0

c  -1+1 --> 0
c    ( b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧  b^{219, 1}_0 ∧  p_219) -> (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧ -b^{219, 2}_0)
c  in CNF:
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_2
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_1
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_0
c  in DIMACS:
-22283  22284 -22285 -219 -22286 0
-22283  22284 -22285 -219 -22287 0
-22283  22284 -22285 -219 -22288 0

c  0+1 --> 1
c    (-b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧  p_219) -> (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0)
c  in CNF:
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_2
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_1
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨  b^{219, 2}_0
c  in DIMACS:
 22283  22284  22285 -219 -22286 0
 22283  22284  22285 -219 -22287 0
 22283  22284  22285 -219  22288 0

c  1+1 --> 2
c    (-b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧  b^{219, 1}_0 ∧  p_219) -> (-b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0)
c  in CNF:
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_2
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨  b^{219, 2}_1
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ -p_219 ∨ -b^{219, 2}_0
c  in DIMACS:
 22283  22284 -22285 -219 -22286 0
 22283  22284 -22285 -219  22287 0
 22283  22284 -22285 -219 -22288 0

c  2+1 --> break 
c    (-b^{219, 1}_2 ∧  b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧  p_219) -> break
c  in CNF:
c     b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ -p_219 ∨ break
c  in DIMACS:
 22283 -22284  22285 -219 1162 0


c  2-1 --> 1
c    (-b^{219, 1}_2 ∧  b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧ -p_219) -> (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0)
c  in CNF:
c     b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_2
c     b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_1
c     b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨  b^{219, 2}_0
c  in DIMACS:
 22283 -22284  22285  219 -22286 0
 22283 -22284  22285  219 -22287 0
 22283 -22284  22285  219  22288 0

c  1-1 --> 0
c    (-b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧  b^{219, 1}_0 ∧ -p_219) -> (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧ -b^{219, 2}_0)
c  in CNF:
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_2
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_1
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_0
c  in DIMACS:
 22283  22284 -22285  219 -22286 0
 22283  22284 -22285  219 -22287 0
 22283  22284 -22285  219 -22288 0

c  0-1 --> -1
c    (-b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧ -p_219) -> ( b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0)
c  in CNF:
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨  b^{219, 2}_2
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_1
c     b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨  b^{219, 2}_0
c  in DIMACS:
 22283  22284  22285  219  22286 0
 22283  22284  22285  219 -22287 0
 22283  22284  22285  219  22288 0

c  -1-1 --> -2
c    ( b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧  b^{219, 1}_0 ∧ -p_219) -> ( b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0)
c  in CNF:
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨  b^{219, 2}_2
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨  b^{219, 2}_1
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨  p_219 ∨ -b^{219, 2}_0
c  in DIMACS:
-22283  22284 -22285  219  22286 0
-22283  22284 -22285  219  22287 0
-22283  22284 -22285  219 -22288 0

c  -2-1 --> break 
c    ( b^{219, 1}_2 ∧  b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧ -p_219) -> break
c  in CNF:
c    -b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨  b^{219, 1}_0 ∨  p_219 ∨ break
c  in DIMACS:
-22283 -22284  22285  219 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{219, 1}_2 ∧ -b^{219, 1}_1 ∧ -b^{219, 1}_0 ∧ true) 
c  in CNF:
c    -b^{219, 1}_2 ∨  b^{219, 1}_1 ∨  b^{219, 1}_0 ∨ false 
c  in DIMACS:
-22283  22284  22285  0

c  3 does not represent an automaton state.
c    -(-b^{219, 1}_2 ∧  b^{219, 1}_1 ∧  b^{219, 1}_0 ∧ true) 
c  in CNF:
c     b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ false 
c  in DIMACS:
 22283 -22284 -22285  0
c  -3 does not represent an automaton state.
c    -( b^{219, 1}_2 ∧  b^{219, 1}_1 ∧  b^{219, 1}_0 ∧ true) 
c  in CNF:
c    -b^{219, 1}_2 ∨ -b^{219, 1}_1 ∨ -b^{219, 1}_0 ∨ false 
c  in DIMACS:
-22283 -22284 -22285  0

c i = 2
c  -2+1 --> -1
c    ( b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧  p_438) -> ( b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0)
c  in CNF:
c    -b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨  b^{219, 3}_2
c    -b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_1
c    -b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨  b^{219, 3}_0
c  in DIMACS:
-22286 -22287  22288 -438  22289 0
-22286 -22287  22288 -438 -22290 0
-22286 -22287  22288 -438  22291 0

c  -1+1 --> 0
c    ( b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0 ∧  p_438) -> (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧ -b^{219, 3}_0)
c  in CNF:
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_2
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_1
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_0
c  in DIMACS:
-22286  22287 -22288 -438 -22289 0
-22286  22287 -22288 -438 -22290 0
-22286  22287 -22288 -438 -22291 0

c  0+1 --> 1
c    (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧  p_438) -> (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0)
c  in CNF:
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_2
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_1
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨  b^{219, 3}_0
c  in DIMACS:
 22286  22287  22288 -438 -22289 0
 22286  22287  22288 -438 -22290 0
 22286  22287  22288 -438  22291 0

c  1+1 --> 2
c    (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0 ∧  p_438) -> (-b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0)
c  in CNF:
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_2
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨  b^{219, 3}_1
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ -p_438 ∨ -b^{219, 3}_0
c  in DIMACS:
 22286  22287 -22288 -438 -22289 0
 22286  22287 -22288 -438  22290 0
 22286  22287 -22288 -438 -22291 0

c  2+1 --> break 
c    (-b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧  p_438) -> break
c  in CNF:
c     b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ -p_438 ∨ break
c  in DIMACS:
 22286 -22287  22288 -438 1162 0


c  2-1 --> 1
c    (-b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧ -p_438) -> (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0)
c  in CNF:
c     b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_2
c     b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_1
c     b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨  b^{219, 3}_0
c  in DIMACS:
 22286 -22287  22288  438 -22289 0
 22286 -22287  22288  438 -22290 0
 22286 -22287  22288  438  22291 0

c  1-1 --> 0
c    (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0 ∧ -p_438) -> (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧ -b^{219, 3}_0)
c  in CNF:
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_2
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_1
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_0
c  in DIMACS:
 22286  22287 -22288  438 -22289 0
 22286  22287 -22288  438 -22290 0
 22286  22287 -22288  438 -22291 0

c  0-1 --> -1
c    (-b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧ -p_438) -> ( b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0)
c  in CNF:
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨  b^{219, 3}_2
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_1
c     b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨  b^{219, 3}_0
c  in DIMACS:
 22286  22287  22288  438  22289 0
 22286  22287  22288  438 -22290 0
 22286  22287  22288  438  22291 0

c  -1-1 --> -2
c    ( b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧  b^{219, 2}_0 ∧ -p_438) -> ( b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0)
c  in CNF:
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨  b^{219, 3}_2
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨  b^{219, 3}_1
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨  p_438 ∨ -b^{219, 3}_0
c  in DIMACS:
-22286  22287 -22288  438  22289 0
-22286  22287 -22288  438  22290 0
-22286  22287 -22288  438 -22291 0

c  -2-1 --> break 
c    ( b^{219, 2}_2 ∧  b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧ -p_438) -> break
c  in CNF:
c    -b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨  b^{219, 2}_0 ∨  p_438 ∨ break
c  in DIMACS:
-22286 -22287  22288  438 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{219, 2}_2 ∧ -b^{219, 2}_1 ∧ -b^{219, 2}_0 ∧ true) 
c  in CNF:
c    -b^{219, 2}_2 ∨  b^{219, 2}_1 ∨  b^{219, 2}_0 ∨ false 
c  in DIMACS:
-22286  22287  22288  0

c  3 does not represent an automaton state.
c    -(-b^{219, 2}_2 ∧  b^{219, 2}_1 ∧  b^{219, 2}_0 ∧ true) 
c  in CNF:
c     b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ false 
c  in DIMACS:
 22286 -22287 -22288  0
c  -3 does not represent an automaton state.
c    -( b^{219, 2}_2 ∧  b^{219, 2}_1 ∧  b^{219, 2}_0 ∧ true) 
c  in CNF:
c    -b^{219, 2}_2 ∨ -b^{219, 2}_1 ∨ -b^{219, 2}_0 ∨ false 
c  in DIMACS:
-22286 -22287 -22288  0

c i = 3
c  -2+1 --> -1
c    ( b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧  p_657) -> ( b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0)
c  in CNF:
c    -b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨  b^{219, 4}_2
c    -b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_1
c    -b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨  b^{219, 4}_0
c  in DIMACS:
-22289 -22290  22291 -657  22292 0
-22289 -22290  22291 -657 -22293 0
-22289 -22290  22291 -657  22294 0

c  -1+1 --> 0
c    ( b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0 ∧  p_657) -> (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧ -b^{219, 4}_0)
c  in CNF:
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_2
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_1
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_0
c  in DIMACS:
-22289  22290 -22291 -657 -22292 0
-22289  22290 -22291 -657 -22293 0
-22289  22290 -22291 -657 -22294 0

c  0+1 --> 1
c    (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧  p_657) -> (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0)
c  in CNF:
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_2
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_1
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨  b^{219, 4}_0
c  in DIMACS:
 22289  22290  22291 -657 -22292 0
 22289  22290  22291 -657 -22293 0
 22289  22290  22291 -657  22294 0

c  1+1 --> 2
c    (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0 ∧  p_657) -> (-b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0)
c  in CNF:
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_2
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨  b^{219, 4}_1
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ -p_657 ∨ -b^{219, 4}_0
c  in DIMACS:
 22289  22290 -22291 -657 -22292 0
 22289  22290 -22291 -657  22293 0
 22289  22290 -22291 -657 -22294 0

c  2+1 --> break 
c    (-b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧  p_657) -> break
c  in CNF:
c     b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ -p_657 ∨ break
c  in DIMACS:
 22289 -22290  22291 -657 1162 0


c  2-1 --> 1
c    (-b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧ -p_657) -> (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0)
c  in CNF:
c     b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_2
c     b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_1
c     b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨  b^{219, 4}_0
c  in DIMACS:
 22289 -22290  22291  657 -22292 0
 22289 -22290  22291  657 -22293 0
 22289 -22290  22291  657  22294 0

c  1-1 --> 0
c    (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0 ∧ -p_657) -> (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧ -b^{219, 4}_0)
c  in CNF:
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_2
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_1
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_0
c  in DIMACS:
 22289  22290 -22291  657 -22292 0
 22289  22290 -22291  657 -22293 0
 22289  22290 -22291  657 -22294 0

c  0-1 --> -1
c    (-b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧ -p_657) -> ( b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0)
c  in CNF:
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨  b^{219, 4}_2
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_1
c     b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨  b^{219, 4}_0
c  in DIMACS:
 22289  22290  22291  657  22292 0
 22289  22290  22291  657 -22293 0
 22289  22290  22291  657  22294 0

c  -1-1 --> -2
c    ( b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧  b^{219, 3}_0 ∧ -p_657) -> ( b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0)
c  in CNF:
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨  b^{219, 4}_2
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨  b^{219, 4}_1
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨  p_657 ∨ -b^{219, 4}_0
c  in DIMACS:
-22289  22290 -22291  657  22292 0
-22289  22290 -22291  657  22293 0
-22289  22290 -22291  657 -22294 0

c  -2-1 --> break 
c    ( b^{219, 3}_2 ∧  b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧ -p_657) -> break
c  in CNF:
c    -b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨  b^{219, 3}_0 ∨  p_657 ∨ break
c  in DIMACS:
-22289 -22290  22291  657 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{219, 3}_2 ∧ -b^{219, 3}_1 ∧ -b^{219, 3}_0 ∧ true) 
c  in CNF:
c    -b^{219, 3}_2 ∨  b^{219, 3}_1 ∨  b^{219, 3}_0 ∨ false 
c  in DIMACS:
-22289  22290  22291  0

c  3 does not represent an automaton state.
c    -(-b^{219, 3}_2 ∧  b^{219, 3}_1 ∧  b^{219, 3}_0 ∧ true) 
c  in CNF:
c     b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ false 
c  in DIMACS:
 22289 -22290 -22291  0
c  -3 does not represent an automaton state.
c    -( b^{219, 3}_2 ∧  b^{219, 3}_1 ∧  b^{219, 3}_0 ∧ true) 
c  in CNF:
c    -b^{219, 3}_2 ∨ -b^{219, 3}_1 ∨ -b^{219, 3}_0 ∨ false 
c  in DIMACS:
-22289 -22290 -22291  0

c i = 4
c  -2+1 --> -1
c    ( b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧  p_876) -> ( b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0)
c  in CNF:
c    -b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨  b^{219, 5}_2
c    -b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_1
c    -b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨  b^{219, 5}_0
c  in DIMACS:
-22292 -22293  22294 -876  22295 0
-22292 -22293  22294 -876 -22296 0
-22292 -22293  22294 -876  22297 0

c  -1+1 --> 0
c    ( b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0 ∧  p_876) -> (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧ -b^{219, 5}_0)
c  in CNF:
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_2
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_1
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_0
c  in DIMACS:
-22292  22293 -22294 -876 -22295 0
-22292  22293 -22294 -876 -22296 0
-22292  22293 -22294 -876 -22297 0

c  0+1 --> 1
c    (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧  p_876) -> (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0)
c  in CNF:
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_2
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_1
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨  b^{219, 5}_0
c  in DIMACS:
 22292  22293  22294 -876 -22295 0
 22292  22293  22294 -876 -22296 0
 22292  22293  22294 -876  22297 0

c  1+1 --> 2
c    (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0 ∧  p_876) -> (-b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0)
c  in CNF:
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_2
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨  b^{219, 5}_1
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ -p_876 ∨ -b^{219, 5}_0
c  in DIMACS:
 22292  22293 -22294 -876 -22295 0
 22292  22293 -22294 -876  22296 0
 22292  22293 -22294 -876 -22297 0

c  2+1 --> break 
c    (-b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧  p_876) -> break
c  in CNF:
c     b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 22292 -22293  22294 -876 1162 0


c  2-1 --> 1
c    (-b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧ -p_876) -> (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0)
c  in CNF:
c     b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_2
c     b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_1
c     b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨  b^{219, 5}_0
c  in DIMACS:
 22292 -22293  22294  876 -22295 0
 22292 -22293  22294  876 -22296 0
 22292 -22293  22294  876  22297 0

c  1-1 --> 0
c    (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0 ∧ -p_876) -> (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧ -b^{219, 5}_0)
c  in CNF:
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_2
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_1
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_0
c  in DIMACS:
 22292  22293 -22294  876 -22295 0
 22292  22293 -22294  876 -22296 0
 22292  22293 -22294  876 -22297 0

c  0-1 --> -1
c    (-b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧ -p_876) -> ( b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0)
c  in CNF:
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨  b^{219, 5}_2
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_1
c     b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨  b^{219, 5}_0
c  in DIMACS:
 22292  22293  22294  876  22295 0
 22292  22293  22294  876 -22296 0
 22292  22293  22294  876  22297 0

c  -1-1 --> -2
c    ( b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧  b^{219, 4}_0 ∧ -p_876) -> ( b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0)
c  in CNF:
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨  b^{219, 5}_2
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨  b^{219, 5}_1
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨  p_876 ∨ -b^{219, 5}_0
c  in DIMACS:
-22292  22293 -22294  876  22295 0
-22292  22293 -22294  876  22296 0
-22292  22293 -22294  876 -22297 0

c  -2-1 --> break 
c    ( b^{219, 4}_2 ∧  b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨  b^{219, 4}_0 ∨  p_876 ∨ break
c  in DIMACS:
-22292 -22293  22294  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{219, 4}_2 ∧ -b^{219, 4}_1 ∧ -b^{219, 4}_0 ∧ true) 
c  in CNF:
c    -b^{219, 4}_2 ∨  b^{219, 4}_1 ∨  b^{219, 4}_0 ∨ false 
c  in DIMACS:
-22292  22293  22294  0

c  3 does not represent an automaton state.
c    -(-b^{219, 4}_2 ∧  b^{219, 4}_1 ∧  b^{219, 4}_0 ∧ true) 
c  in CNF:
c     b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ false 
c  in DIMACS:
 22292 -22293 -22294  0
c  -3 does not represent an automaton state.
c    -( b^{219, 4}_2 ∧  b^{219, 4}_1 ∧  b^{219, 4}_0 ∧ true) 
c  in CNF:
c    -b^{219, 4}_2 ∨ -b^{219, 4}_1 ∨ -b^{219, 4}_0 ∨ false 
c  in DIMACS:
-22292 -22293 -22294  0

c i = 5
c  -2+1 --> -1
c    ( b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧  p_1095) -> ( b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧  b^{219, 6}_0)
c  in CNF:
c    -b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨  b^{219, 6}_2
c    -b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_1
c    -b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨  b^{219, 6}_0
c  in DIMACS:
-22295 -22296  22297 -1095  22298 0
-22295 -22296  22297 -1095 -22299 0
-22295 -22296  22297 -1095  22300 0

c  -1+1 --> 0
c    ( b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0 ∧  p_1095) -> (-b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧ -b^{219, 6}_0)
c  in CNF:
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_2
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_1
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_0
c  in DIMACS:
-22295  22296 -22297 -1095 -22298 0
-22295  22296 -22297 -1095 -22299 0
-22295  22296 -22297 -1095 -22300 0

c  0+1 --> 1
c    (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧  p_1095) -> (-b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧  b^{219, 6}_0)
c  in CNF:
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_2
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_1
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨  b^{219, 6}_0
c  in DIMACS:
 22295  22296  22297 -1095 -22298 0
 22295  22296  22297 -1095 -22299 0
 22295  22296  22297 -1095  22300 0

c  1+1 --> 2
c    (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0 ∧  p_1095) -> (-b^{219, 6}_2 ∧  b^{219, 6}_1 ∧ -b^{219, 6}_0)
c  in CNF:
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_2
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨  b^{219, 6}_1
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ -p_1095 ∨ -b^{219, 6}_0
c  in DIMACS:
 22295  22296 -22297 -1095 -22298 0
 22295  22296 -22297 -1095  22299 0
 22295  22296 -22297 -1095 -22300 0

c  2+1 --> break 
c    (-b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 22295 -22296  22297 -1095 1162 0


c  2-1 --> 1
c    (-b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧ -p_1095) -> (-b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧  b^{219, 6}_0)
c  in CNF:
c     b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_2
c     b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_1
c     b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨  b^{219, 6}_0
c  in DIMACS:
 22295 -22296  22297  1095 -22298 0
 22295 -22296  22297  1095 -22299 0
 22295 -22296  22297  1095  22300 0

c  1-1 --> 0
c    (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0 ∧ -p_1095) -> (-b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧ -b^{219, 6}_0)
c  in CNF:
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_2
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_1
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_0
c  in DIMACS:
 22295  22296 -22297  1095 -22298 0
 22295  22296 -22297  1095 -22299 0
 22295  22296 -22297  1095 -22300 0

c  0-1 --> -1
c    (-b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧ -p_1095) -> ( b^{219, 6}_2 ∧ -b^{219, 6}_1 ∧  b^{219, 6}_0)
c  in CNF:
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨  b^{219, 6}_2
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_1
c     b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨  b^{219, 6}_0
c  in DIMACS:
 22295  22296  22297  1095  22298 0
 22295  22296  22297  1095 -22299 0
 22295  22296  22297  1095  22300 0

c  -1-1 --> -2
c    ( b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧  b^{219, 5}_0 ∧ -p_1095) -> ( b^{219, 6}_2 ∧  b^{219, 6}_1 ∧ -b^{219, 6}_0)
c  in CNF:
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨  b^{219, 6}_2
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨  b^{219, 6}_1
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨  p_1095 ∨ -b^{219, 6}_0
c  in DIMACS:
-22295  22296 -22297  1095  22298 0
-22295  22296 -22297  1095  22299 0
-22295  22296 -22297  1095 -22300 0

c  -2-1 --> break 
c    ( b^{219, 5}_2 ∧  b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨  b^{219, 5}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-22295 -22296  22297  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{219, 5}_2 ∧ -b^{219, 5}_1 ∧ -b^{219, 5}_0 ∧ true) 
c  in CNF:
c    -b^{219, 5}_2 ∨  b^{219, 5}_1 ∨  b^{219, 5}_0 ∨ false 
c  in DIMACS:
-22295  22296  22297  0

c  3 does not represent an automaton state.
c    -(-b^{219, 5}_2 ∧  b^{219, 5}_1 ∧  b^{219, 5}_0 ∧ true) 
c  in CNF:
c     b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ false 
c  in DIMACS:
 22295 -22296 -22297  0
c  -3 does not represent an automaton state.
c    -( b^{219, 5}_2 ∧  b^{219, 5}_1 ∧  b^{219, 5}_0 ∧ true) 
c  in CNF:
c    -b^{219, 5}_2 ∨ -b^{219, 5}_1 ∨ -b^{219, 5}_0 ∨ false 
c  in DIMACS:
-22295 -22296 -22297  0

c INIT for k = 220
c    -b^{220, 1}_2
c    -b^{220, 1}_1
c    -b^{220, 1}_0
c  in DIMACS:
-22301 0
-22302 0
-22303 0

c Transitions for k = 220
c i = 1
c  -2+1 --> -1
c    ( b^{220, 1}_2 ∧  b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧  p_220) -> ( b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0)
c  in CNF:
c    -b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨  b^{220, 2}_2
c    -b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_1
c    -b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨  b^{220, 2}_0
c  in DIMACS:
-22301 -22302  22303 -220  22304 0
-22301 -22302  22303 -220 -22305 0
-22301 -22302  22303 -220  22306 0

c  -1+1 --> 0
c    ( b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧  b^{220, 1}_0 ∧  p_220) -> (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧ -b^{220, 2}_0)
c  in CNF:
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_2
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_1
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_0
c  in DIMACS:
-22301  22302 -22303 -220 -22304 0
-22301  22302 -22303 -220 -22305 0
-22301  22302 -22303 -220 -22306 0

c  0+1 --> 1
c    (-b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧  p_220) -> (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0)
c  in CNF:
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_2
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_1
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨  b^{220, 2}_0
c  in DIMACS:
 22301  22302  22303 -220 -22304 0
 22301  22302  22303 -220 -22305 0
 22301  22302  22303 -220  22306 0

c  1+1 --> 2
c    (-b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧  b^{220, 1}_0 ∧  p_220) -> (-b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0)
c  in CNF:
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_2
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨  b^{220, 2}_1
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ -p_220 ∨ -b^{220, 2}_0
c  in DIMACS:
 22301  22302 -22303 -220 -22304 0
 22301  22302 -22303 -220  22305 0
 22301  22302 -22303 -220 -22306 0

c  2+1 --> break 
c    (-b^{220, 1}_2 ∧  b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧  p_220) -> break
c  in CNF:
c     b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ -p_220 ∨ break
c  in DIMACS:
 22301 -22302  22303 -220 1162 0


c  2-1 --> 1
c    (-b^{220, 1}_2 ∧  b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧ -p_220) -> (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0)
c  in CNF:
c     b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_2
c     b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_1
c     b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨  b^{220, 2}_0
c  in DIMACS:
 22301 -22302  22303  220 -22304 0
 22301 -22302  22303  220 -22305 0
 22301 -22302  22303  220  22306 0

c  1-1 --> 0
c    (-b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧  b^{220, 1}_0 ∧ -p_220) -> (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧ -b^{220, 2}_0)
c  in CNF:
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_2
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_1
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_0
c  in DIMACS:
 22301  22302 -22303  220 -22304 0
 22301  22302 -22303  220 -22305 0
 22301  22302 -22303  220 -22306 0

c  0-1 --> -1
c    (-b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧ -p_220) -> ( b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0)
c  in CNF:
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨  b^{220, 2}_2
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_1
c     b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨  b^{220, 2}_0
c  in DIMACS:
 22301  22302  22303  220  22304 0
 22301  22302  22303  220 -22305 0
 22301  22302  22303  220  22306 0

c  -1-1 --> -2
c    ( b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧  b^{220, 1}_0 ∧ -p_220) -> ( b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0)
c  in CNF:
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨  b^{220, 2}_2
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨  b^{220, 2}_1
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨  p_220 ∨ -b^{220, 2}_0
c  in DIMACS:
-22301  22302 -22303  220  22304 0
-22301  22302 -22303  220  22305 0
-22301  22302 -22303  220 -22306 0

c  -2-1 --> break 
c    ( b^{220, 1}_2 ∧  b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧ -p_220) -> break
c  in CNF:
c    -b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨  b^{220, 1}_0 ∨  p_220 ∨ break
c  in DIMACS:
-22301 -22302  22303  220 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{220, 1}_2 ∧ -b^{220, 1}_1 ∧ -b^{220, 1}_0 ∧ true) 
c  in CNF:
c    -b^{220, 1}_2 ∨  b^{220, 1}_1 ∨  b^{220, 1}_0 ∨ false 
c  in DIMACS:
-22301  22302  22303  0

c  3 does not represent an automaton state.
c    -(-b^{220, 1}_2 ∧  b^{220, 1}_1 ∧  b^{220, 1}_0 ∧ true) 
c  in CNF:
c     b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ false 
c  in DIMACS:
 22301 -22302 -22303  0
c  -3 does not represent an automaton state.
c    -( b^{220, 1}_2 ∧  b^{220, 1}_1 ∧  b^{220, 1}_0 ∧ true) 
c  in CNF:
c    -b^{220, 1}_2 ∨ -b^{220, 1}_1 ∨ -b^{220, 1}_0 ∨ false 
c  in DIMACS:
-22301 -22302 -22303  0

c i = 2
c  -2+1 --> -1
c    ( b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧  p_440) -> ( b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0)
c  in CNF:
c    -b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨  b^{220, 3}_2
c    -b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_1
c    -b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨  b^{220, 3}_0
c  in DIMACS:
-22304 -22305  22306 -440  22307 0
-22304 -22305  22306 -440 -22308 0
-22304 -22305  22306 -440  22309 0

c  -1+1 --> 0
c    ( b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0 ∧  p_440) -> (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧ -b^{220, 3}_0)
c  in CNF:
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_2
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_1
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_0
c  in DIMACS:
-22304  22305 -22306 -440 -22307 0
-22304  22305 -22306 -440 -22308 0
-22304  22305 -22306 -440 -22309 0

c  0+1 --> 1
c    (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧  p_440) -> (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0)
c  in CNF:
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_2
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_1
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨  b^{220, 3}_0
c  in DIMACS:
 22304  22305  22306 -440 -22307 0
 22304  22305  22306 -440 -22308 0
 22304  22305  22306 -440  22309 0

c  1+1 --> 2
c    (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0 ∧  p_440) -> (-b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0)
c  in CNF:
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_2
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨  b^{220, 3}_1
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ -p_440 ∨ -b^{220, 3}_0
c  in DIMACS:
 22304  22305 -22306 -440 -22307 0
 22304  22305 -22306 -440  22308 0
 22304  22305 -22306 -440 -22309 0

c  2+1 --> break 
c    (-b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧  p_440) -> break
c  in CNF:
c     b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ -p_440 ∨ break
c  in DIMACS:
 22304 -22305  22306 -440 1162 0


c  2-1 --> 1
c    (-b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧ -p_440) -> (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0)
c  in CNF:
c     b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_2
c     b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_1
c     b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨  b^{220, 3}_0
c  in DIMACS:
 22304 -22305  22306  440 -22307 0
 22304 -22305  22306  440 -22308 0
 22304 -22305  22306  440  22309 0

c  1-1 --> 0
c    (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0 ∧ -p_440) -> (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧ -b^{220, 3}_0)
c  in CNF:
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_2
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_1
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_0
c  in DIMACS:
 22304  22305 -22306  440 -22307 0
 22304  22305 -22306  440 -22308 0
 22304  22305 -22306  440 -22309 0

c  0-1 --> -1
c    (-b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧ -p_440) -> ( b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0)
c  in CNF:
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨  b^{220, 3}_2
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_1
c     b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨  b^{220, 3}_0
c  in DIMACS:
 22304  22305  22306  440  22307 0
 22304  22305  22306  440 -22308 0
 22304  22305  22306  440  22309 0

c  -1-1 --> -2
c    ( b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧  b^{220, 2}_0 ∧ -p_440) -> ( b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0)
c  in CNF:
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨  b^{220, 3}_2
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨  b^{220, 3}_1
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨  p_440 ∨ -b^{220, 3}_0
c  in DIMACS:
-22304  22305 -22306  440  22307 0
-22304  22305 -22306  440  22308 0
-22304  22305 -22306  440 -22309 0

c  -2-1 --> break 
c    ( b^{220, 2}_2 ∧  b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧ -p_440) -> break
c  in CNF:
c    -b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨  b^{220, 2}_0 ∨  p_440 ∨ break
c  in DIMACS:
-22304 -22305  22306  440 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{220, 2}_2 ∧ -b^{220, 2}_1 ∧ -b^{220, 2}_0 ∧ true) 
c  in CNF:
c    -b^{220, 2}_2 ∨  b^{220, 2}_1 ∨  b^{220, 2}_0 ∨ false 
c  in DIMACS:
-22304  22305  22306  0

c  3 does not represent an automaton state.
c    -(-b^{220, 2}_2 ∧  b^{220, 2}_1 ∧  b^{220, 2}_0 ∧ true) 
c  in CNF:
c     b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ false 
c  in DIMACS:
 22304 -22305 -22306  0
c  -3 does not represent an automaton state.
c    -( b^{220, 2}_2 ∧  b^{220, 2}_1 ∧  b^{220, 2}_0 ∧ true) 
c  in CNF:
c    -b^{220, 2}_2 ∨ -b^{220, 2}_1 ∨ -b^{220, 2}_0 ∨ false 
c  in DIMACS:
-22304 -22305 -22306  0

c i = 3
c  -2+1 --> -1
c    ( b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧  p_660) -> ( b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0)
c  in CNF:
c    -b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨  b^{220, 4}_2
c    -b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_1
c    -b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨  b^{220, 4}_0
c  in DIMACS:
-22307 -22308  22309 -660  22310 0
-22307 -22308  22309 -660 -22311 0
-22307 -22308  22309 -660  22312 0

c  -1+1 --> 0
c    ( b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0 ∧  p_660) -> (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧ -b^{220, 4}_0)
c  in CNF:
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_2
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_1
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_0
c  in DIMACS:
-22307  22308 -22309 -660 -22310 0
-22307  22308 -22309 -660 -22311 0
-22307  22308 -22309 -660 -22312 0

c  0+1 --> 1
c    (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧  p_660) -> (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0)
c  in CNF:
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_2
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_1
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨  b^{220, 4}_0
c  in DIMACS:
 22307  22308  22309 -660 -22310 0
 22307  22308  22309 -660 -22311 0
 22307  22308  22309 -660  22312 0

c  1+1 --> 2
c    (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0 ∧  p_660) -> (-b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0)
c  in CNF:
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_2
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨  b^{220, 4}_1
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ -p_660 ∨ -b^{220, 4}_0
c  in DIMACS:
 22307  22308 -22309 -660 -22310 0
 22307  22308 -22309 -660  22311 0
 22307  22308 -22309 -660 -22312 0

c  2+1 --> break 
c    (-b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧  p_660) -> break
c  in CNF:
c     b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 22307 -22308  22309 -660 1162 0


c  2-1 --> 1
c    (-b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧ -p_660) -> (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0)
c  in CNF:
c     b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_2
c     b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_1
c     b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨  b^{220, 4}_0
c  in DIMACS:
 22307 -22308  22309  660 -22310 0
 22307 -22308  22309  660 -22311 0
 22307 -22308  22309  660  22312 0

c  1-1 --> 0
c    (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0 ∧ -p_660) -> (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧ -b^{220, 4}_0)
c  in CNF:
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_2
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_1
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_0
c  in DIMACS:
 22307  22308 -22309  660 -22310 0
 22307  22308 -22309  660 -22311 0
 22307  22308 -22309  660 -22312 0

c  0-1 --> -1
c    (-b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧ -p_660) -> ( b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0)
c  in CNF:
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨  b^{220, 4}_2
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_1
c     b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨  b^{220, 4}_0
c  in DIMACS:
 22307  22308  22309  660  22310 0
 22307  22308  22309  660 -22311 0
 22307  22308  22309  660  22312 0

c  -1-1 --> -2
c    ( b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧  b^{220, 3}_0 ∧ -p_660) -> ( b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0)
c  in CNF:
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨  b^{220, 4}_2
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨  b^{220, 4}_1
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨  p_660 ∨ -b^{220, 4}_0
c  in DIMACS:
-22307  22308 -22309  660  22310 0
-22307  22308 -22309  660  22311 0
-22307  22308 -22309  660 -22312 0

c  -2-1 --> break 
c    ( b^{220, 3}_2 ∧  b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨  b^{220, 3}_0 ∨  p_660 ∨ break
c  in DIMACS:
-22307 -22308  22309  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{220, 3}_2 ∧ -b^{220, 3}_1 ∧ -b^{220, 3}_0 ∧ true) 
c  in CNF:
c    -b^{220, 3}_2 ∨  b^{220, 3}_1 ∨  b^{220, 3}_0 ∨ false 
c  in DIMACS:
-22307  22308  22309  0

c  3 does not represent an automaton state.
c    -(-b^{220, 3}_2 ∧  b^{220, 3}_1 ∧  b^{220, 3}_0 ∧ true) 
c  in CNF:
c     b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ false 
c  in DIMACS:
 22307 -22308 -22309  0
c  -3 does not represent an automaton state.
c    -( b^{220, 3}_2 ∧  b^{220, 3}_1 ∧  b^{220, 3}_0 ∧ true) 
c  in CNF:
c    -b^{220, 3}_2 ∨ -b^{220, 3}_1 ∨ -b^{220, 3}_0 ∨ false 
c  in DIMACS:
-22307 -22308 -22309  0

c i = 4
c  -2+1 --> -1
c    ( b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧  p_880) -> ( b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0)
c  in CNF:
c    -b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨  b^{220, 5}_2
c    -b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_1
c    -b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨  b^{220, 5}_0
c  in DIMACS:
-22310 -22311  22312 -880  22313 0
-22310 -22311  22312 -880 -22314 0
-22310 -22311  22312 -880  22315 0

c  -1+1 --> 0
c    ( b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0 ∧  p_880) -> (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧ -b^{220, 5}_0)
c  in CNF:
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_2
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_1
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_0
c  in DIMACS:
-22310  22311 -22312 -880 -22313 0
-22310  22311 -22312 -880 -22314 0
-22310  22311 -22312 -880 -22315 0

c  0+1 --> 1
c    (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧  p_880) -> (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0)
c  in CNF:
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_2
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_1
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨  b^{220, 5}_0
c  in DIMACS:
 22310  22311  22312 -880 -22313 0
 22310  22311  22312 -880 -22314 0
 22310  22311  22312 -880  22315 0

c  1+1 --> 2
c    (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0 ∧  p_880) -> (-b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0)
c  in CNF:
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_2
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨  b^{220, 5}_1
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ -p_880 ∨ -b^{220, 5}_0
c  in DIMACS:
 22310  22311 -22312 -880 -22313 0
 22310  22311 -22312 -880  22314 0
 22310  22311 -22312 -880 -22315 0

c  2+1 --> break 
c    (-b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧  p_880) -> break
c  in CNF:
c     b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ -p_880 ∨ break
c  in DIMACS:
 22310 -22311  22312 -880 1162 0


c  2-1 --> 1
c    (-b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧ -p_880) -> (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0)
c  in CNF:
c     b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_2
c     b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_1
c     b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨  b^{220, 5}_0
c  in DIMACS:
 22310 -22311  22312  880 -22313 0
 22310 -22311  22312  880 -22314 0
 22310 -22311  22312  880  22315 0

c  1-1 --> 0
c    (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0 ∧ -p_880) -> (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧ -b^{220, 5}_0)
c  in CNF:
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_2
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_1
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_0
c  in DIMACS:
 22310  22311 -22312  880 -22313 0
 22310  22311 -22312  880 -22314 0
 22310  22311 -22312  880 -22315 0

c  0-1 --> -1
c    (-b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧ -p_880) -> ( b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0)
c  in CNF:
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨  b^{220, 5}_2
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_1
c     b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨  b^{220, 5}_0
c  in DIMACS:
 22310  22311  22312  880  22313 0
 22310  22311  22312  880 -22314 0
 22310  22311  22312  880  22315 0

c  -1-1 --> -2
c    ( b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧  b^{220, 4}_0 ∧ -p_880) -> ( b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0)
c  in CNF:
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨  b^{220, 5}_2
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨  b^{220, 5}_1
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨  p_880 ∨ -b^{220, 5}_0
c  in DIMACS:
-22310  22311 -22312  880  22313 0
-22310  22311 -22312  880  22314 0
-22310  22311 -22312  880 -22315 0

c  -2-1 --> break 
c    ( b^{220, 4}_2 ∧  b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧ -p_880) -> break
c  in CNF:
c    -b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨  b^{220, 4}_0 ∨  p_880 ∨ break
c  in DIMACS:
-22310 -22311  22312  880 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{220, 4}_2 ∧ -b^{220, 4}_1 ∧ -b^{220, 4}_0 ∧ true) 
c  in CNF:
c    -b^{220, 4}_2 ∨  b^{220, 4}_1 ∨  b^{220, 4}_0 ∨ false 
c  in DIMACS:
-22310  22311  22312  0

c  3 does not represent an automaton state.
c    -(-b^{220, 4}_2 ∧  b^{220, 4}_1 ∧  b^{220, 4}_0 ∧ true) 
c  in CNF:
c     b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ false 
c  in DIMACS:
 22310 -22311 -22312  0
c  -3 does not represent an automaton state.
c    -( b^{220, 4}_2 ∧  b^{220, 4}_1 ∧  b^{220, 4}_0 ∧ true) 
c  in CNF:
c    -b^{220, 4}_2 ∨ -b^{220, 4}_1 ∨ -b^{220, 4}_0 ∨ false 
c  in DIMACS:
-22310 -22311 -22312  0

c i = 5
c  -2+1 --> -1
c    ( b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧  p_1100) -> ( b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧  b^{220, 6}_0)
c  in CNF:
c    -b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨  b^{220, 6}_2
c    -b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_1
c    -b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨  b^{220, 6}_0
c  in DIMACS:
-22313 -22314  22315 -1100  22316 0
-22313 -22314  22315 -1100 -22317 0
-22313 -22314  22315 -1100  22318 0

c  -1+1 --> 0
c    ( b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0 ∧  p_1100) -> (-b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧ -b^{220, 6}_0)
c  in CNF:
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_2
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_1
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_0
c  in DIMACS:
-22313  22314 -22315 -1100 -22316 0
-22313  22314 -22315 -1100 -22317 0
-22313  22314 -22315 -1100 -22318 0

c  0+1 --> 1
c    (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧  p_1100) -> (-b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧  b^{220, 6}_0)
c  in CNF:
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_2
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_1
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨  b^{220, 6}_0
c  in DIMACS:
 22313  22314  22315 -1100 -22316 0
 22313  22314  22315 -1100 -22317 0
 22313  22314  22315 -1100  22318 0

c  1+1 --> 2
c    (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0 ∧  p_1100) -> (-b^{220, 6}_2 ∧  b^{220, 6}_1 ∧ -b^{220, 6}_0)
c  in CNF:
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_2
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨  b^{220, 6}_1
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ -p_1100 ∨ -b^{220, 6}_0
c  in DIMACS:
 22313  22314 -22315 -1100 -22316 0
 22313  22314 -22315 -1100  22317 0
 22313  22314 -22315 -1100 -22318 0

c  2+1 --> break 
c    (-b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 22313 -22314  22315 -1100 1162 0


c  2-1 --> 1
c    (-b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧ -p_1100) -> (-b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧  b^{220, 6}_0)
c  in CNF:
c     b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_2
c     b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_1
c     b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨  b^{220, 6}_0
c  in DIMACS:
 22313 -22314  22315  1100 -22316 0
 22313 -22314  22315  1100 -22317 0
 22313 -22314  22315  1100  22318 0

c  1-1 --> 0
c    (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0 ∧ -p_1100) -> (-b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧ -b^{220, 6}_0)
c  in CNF:
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_2
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_1
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_0
c  in DIMACS:
 22313  22314 -22315  1100 -22316 0
 22313  22314 -22315  1100 -22317 0
 22313  22314 -22315  1100 -22318 0

c  0-1 --> -1
c    (-b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧ -p_1100) -> ( b^{220, 6}_2 ∧ -b^{220, 6}_1 ∧  b^{220, 6}_0)
c  in CNF:
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨  b^{220, 6}_2
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_1
c     b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨  b^{220, 6}_0
c  in DIMACS:
 22313  22314  22315  1100  22316 0
 22313  22314  22315  1100 -22317 0
 22313  22314  22315  1100  22318 0

c  -1-1 --> -2
c    ( b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧  b^{220, 5}_0 ∧ -p_1100) -> ( b^{220, 6}_2 ∧  b^{220, 6}_1 ∧ -b^{220, 6}_0)
c  in CNF:
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨  b^{220, 6}_2
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨  b^{220, 6}_1
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨  p_1100 ∨ -b^{220, 6}_0
c  in DIMACS:
-22313  22314 -22315  1100  22316 0
-22313  22314 -22315  1100  22317 0
-22313  22314 -22315  1100 -22318 0

c  -2-1 --> break 
c    ( b^{220, 5}_2 ∧  b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨  b^{220, 5}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-22313 -22314  22315  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{220, 5}_2 ∧ -b^{220, 5}_1 ∧ -b^{220, 5}_0 ∧ true) 
c  in CNF:
c    -b^{220, 5}_2 ∨  b^{220, 5}_1 ∨  b^{220, 5}_0 ∨ false 
c  in DIMACS:
-22313  22314  22315  0

c  3 does not represent an automaton state.
c    -(-b^{220, 5}_2 ∧  b^{220, 5}_1 ∧  b^{220, 5}_0 ∧ true) 
c  in CNF:
c     b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ false 
c  in DIMACS:
 22313 -22314 -22315  0
c  -3 does not represent an automaton state.
c    -( b^{220, 5}_2 ∧  b^{220, 5}_1 ∧  b^{220, 5}_0 ∧ true) 
c  in CNF:
c    -b^{220, 5}_2 ∨ -b^{220, 5}_1 ∨ -b^{220, 5}_0 ∨ false 
c  in DIMACS:
-22313 -22314 -22315  0

c INIT for k = 221
c    -b^{221, 1}_2
c    -b^{221, 1}_1
c    -b^{221, 1}_0
c  in DIMACS:
-22319 0
-22320 0
-22321 0

c Transitions for k = 221
c i = 1
c  -2+1 --> -1
c    ( b^{221, 1}_2 ∧  b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧  p_221) -> ( b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0)
c  in CNF:
c    -b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨  b^{221, 2}_2
c    -b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_1
c    -b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨  b^{221, 2}_0
c  in DIMACS:
-22319 -22320  22321 -221  22322 0
-22319 -22320  22321 -221 -22323 0
-22319 -22320  22321 -221  22324 0

c  -1+1 --> 0
c    ( b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧  b^{221, 1}_0 ∧  p_221) -> (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧ -b^{221, 2}_0)
c  in CNF:
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_2
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_1
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_0
c  in DIMACS:
-22319  22320 -22321 -221 -22322 0
-22319  22320 -22321 -221 -22323 0
-22319  22320 -22321 -221 -22324 0

c  0+1 --> 1
c    (-b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧  p_221) -> (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0)
c  in CNF:
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_2
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_1
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨  b^{221, 2}_0
c  in DIMACS:
 22319  22320  22321 -221 -22322 0
 22319  22320  22321 -221 -22323 0
 22319  22320  22321 -221  22324 0

c  1+1 --> 2
c    (-b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧  b^{221, 1}_0 ∧  p_221) -> (-b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0)
c  in CNF:
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_2
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨  b^{221, 2}_1
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ -p_221 ∨ -b^{221, 2}_0
c  in DIMACS:
 22319  22320 -22321 -221 -22322 0
 22319  22320 -22321 -221  22323 0
 22319  22320 -22321 -221 -22324 0

c  2+1 --> break 
c    (-b^{221, 1}_2 ∧  b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧  p_221) -> break
c  in CNF:
c     b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ -p_221 ∨ break
c  in DIMACS:
 22319 -22320  22321 -221 1162 0


c  2-1 --> 1
c    (-b^{221, 1}_2 ∧  b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧ -p_221) -> (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0)
c  in CNF:
c     b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_2
c     b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_1
c     b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨  b^{221, 2}_0
c  in DIMACS:
 22319 -22320  22321  221 -22322 0
 22319 -22320  22321  221 -22323 0
 22319 -22320  22321  221  22324 0

c  1-1 --> 0
c    (-b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧  b^{221, 1}_0 ∧ -p_221) -> (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧ -b^{221, 2}_0)
c  in CNF:
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_2
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_1
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_0
c  in DIMACS:
 22319  22320 -22321  221 -22322 0
 22319  22320 -22321  221 -22323 0
 22319  22320 -22321  221 -22324 0

c  0-1 --> -1
c    (-b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧ -p_221) -> ( b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0)
c  in CNF:
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨  b^{221, 2}_2
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_1
c     b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨  b^{221, 2}_0
c  in DIMACS:
 22319  22320  22321  221  22322 0
 22319  22320  22321  221 -22323 0
 22319  22320  22321  221  22324 0

c  -1-1 --> -2
c    ( b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧  b^{221, 1}_0 ∧ -p_221) -> ( b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0)
c  in CNF:
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨  b^{221, 2}_2
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨  b^{221, 2}_1
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨  p_221 ∨ -b^{221, 2}_0
c  in DIMACS:
-22319  22320 -22321  221  22322 0
-22319  22320 -22321  221  22323 0
-22319  22320 -22321  221 -22324 0

c  -2-1 --> break 
c    ( b^{221, 1}_2 ∧  b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧ -p_221) -> break
c  in CNF:
c    -b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨  b^{221, 1}_0 ∨  p_221 ∨ break
c  in DIMACS:
-22319 -22320  22321  221 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{221, 1}_2 ∧ -b^{221, 1}_1 ∧ -b^{221, 1}_0 ∧ true) 
c  in CNF:
c    -b^{221, 1}_2 ∨  b^{221, 1}_1 ∨  b^{221, 1}_0 ∨ false 
c  in DIMACS:
-22319  22320  22321  0

c  3 does not represent an automaton state.
c    -(-b^{221, 1}_2 ∧  b^{221, 1}_1 ∧  b^{221, 1}_0 ∧ true) 
c  in CNF:
c     b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ false 
c  in DIMACS:
 22319 -22320 -22321  0
c  -3 does not represent an automaton state.
c    -( b^{221, 1}_2 ∧  b^{221, 1}_1 ∧  b^{221, 1}_0 ∧ true) 
c  in CNF:
c    -b^{221, 1}_2 ∨ -b^{221, 1}_1 ∨ -b^{221, 1}_0 ∨ false 
c  in DIMACS:
-22319 -22320 -22321  0

c i = 2
c  -2+1 --> -1
c    ( b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧  p_442) -> ( b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0)
c  in CNF:
c    -b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨  b^{221, 3}_2
c    -b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_1
c    -b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨  b^{221, 3}_0
c  in DIMACS:
-22322 -22323  22324 -442  22325 0
-22322 -22323  22324 -442 -22326 0
-22322 -22323  22324 -442  22327 0

c  -1+1 --> 0
c    ( b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0 ∧  p_442) -> (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧ -b^{221, 3}_0)
c  in CNF:
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_2
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_1
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_0
c  in DIMACS:
-22322  22323 -22324 -442 -22325 0
-22322  22323 -22324 -442 -22326 0
-22322  22323 -22324 -442 -22327 0

c  0+1 --> 1
c    (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧  p_442) -> (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0)
c  in CNF:
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_2
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_1
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨  b^{221, 3}_0
c  in DIMACS:
 22322  22323  22324 -442 -22325 0
 22322  22323  22324 -442 -22326 0
 22322  22323  22324 -442  22327 0

c  1+1 --> 2
c    (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0 ∧  p_442) -> (-b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0)
c  in CNF:
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_2
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨  b^{221, 3}_1
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ -p_442 ∨ -b^{221, 3}_0
c  in DIMACS:
 22322  22323 -22324 -442 -22325 0
 22322  22323 -22324 -442  22326 0
 22322  22323 -22324 -442 -22327 0

c  2+1 --> break 
c    (-b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧  p_442) -> break
c  in CNF:
c     b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ -p_442 ∨ break
c  in DIMACS:
 22322 -22323  22324 -442 1162 0


c  2-1 --> 1
c    (-b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧ -p_442) -> (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0)
c  in CNF:
c     b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_2
c     b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_1
c     b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨  b^{221, 3}_0
c  in DIMACS:
 22322 -22323  22324  442 -22325 0
 22322 -22323  22324  442 -22326 0
 22322 -22323  22324  442  22327 0

c  1-1 --> 0
c    (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0 ∧ -p_442) -> (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧ -b^{221, 3}_0)
c  in CNF:
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_2
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_1
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_0
c  in DIMACS:
 22322  22323 -22324  442 -22325 0
 22322  22323 -22324  442 -22326 0
 22322  22323 -22324  442 -22327 0

c  0-1 --> -1
c    (-b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧ -p_442) -> ( b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0)
c  in CNF:
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨  b^{221, 3}_2
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_1
c     b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨  b^{221, 3}_0
c  in DIMACS:
 22322  22323  22324  442  22325 0
 22322  22323  22324  442 -22326 0
 22322  22323  22324  442  22327 0

c  -1-1 --> -2
c    ( b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧  b^{221, 2}_0 ∧ -p_442) -> ( b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0)
c  in CNF:
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨  b^{221, 3}_2
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨  b^{221, 3}_1
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨  p_442 ∨ -b^{221, 3}_0
c  in DIMACS:
-22322  22323 -22324  442  22325 0
-22322  22323 -22324  442  22326 0
-22322  22323 -22324  442 -22327 0

c  -2-1 --> break 
c    ( b^{221, 2}_2 ∧  b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧ -p_442) -> break
c  in CNF:
c    -b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨  b^{221, 2}_0 ∨  p_442 ∨ break
c  in DIMACS:
-22322 -22323  22324  442 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{221, 2}_2 ∧ -b^{221, 2}_1 ∧ -b^{221, 2}_0 ∧ true) 
c  in CNF:
c    -b^{221, 2}_2 ∨  b^{221, 2}_1 ∨  b^{221, 2}_0 ∨ false 
c  in DIMACS:
-22322  22323  22324  0

c  3 does not represent an automaton state.
c    -(-b^{221, 2}_2 ∧  b^{221, 2}_1 ∧  b^{221, 2}_0 ∧ true) 
c  in CNF:
c     b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ false 
c  in DIMACS:
 22322 -22323 -22324  0
c  -3 does not represent an automaton state.
c    -( b^{221, 2}_2 ∧  b^{221, 2}_1 ∧  b^{221, 2}_0 ∧ true) 
c  in CNF:
c    -b^{221, 2}_2 ∨ -b^{221, 2}_1 ∨ -b^{221, 2}_0 ∨ false 
c  in DIMACS:
-22322 -22323 -22324  0

c i = 3
c  -2+1 --> -1
c    ( b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧  p_663) -> ( b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0)
c  in CNF:
c    -b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨  b^{221, 4}_2
c    -b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_1
c    -b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨  b^{221, 4}_0
c  in DIMACS:
-22325 -22326  22327 -663  22328 0
-22325 -22326  22327 -663 -22329 0
-22325 -22326  22327 -663  22330 0

c  -1+1 --> 0
c    ( b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0 ∧  p_663) -> (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧ -b^{221, 4}_0)
c  in CNF:
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_2
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_1
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_0
c  in DIMACS:
-22325  22326 -22327 -663 -22328 0
-22325  22326 -22327 -663 -22329 0
-22325  22326 -22327 -663 -22330 0

c  0+1 --> 1
c    (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧  p_663) -> (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0)
c  in CNF:
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_2
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_1
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨  b^{221, 4}_0
c  in DIMACS:
 22325  22326  22327 -663 -22328 0
 22325  22326  22327 -663 -22329 0
 22325  22326  22327 -663  22330 0

c  1+1 --> 2
c    (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0 ∧  p_663) -> (-b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0)
c  in CNF:
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_2
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨  b^{221, 4}_1
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ -p_663 ∨ -b^{221, 4}_0
c  in DIMACS:
 22325  22326 -22327 -663 -22328 0
 22325  22326 -22327 -663  22329 0
 22325  22326 -22327 -663 -22330 0

c  2+1 --> break 
c    (-b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧  p_663) -> break
c  in CNF:
c     b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ -p_663 ∨ break
c  in DIMACS:
 22325 -22326  22327 -663 1162 0


c  2-1 --> 1
c    (-b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧ -p_663) -> (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0)
c  in CNF:
c     b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_2
c     b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_1
c     b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨  b^{221, 4}_0
c  in DIMACS:
 22325 -22326  22327  663 -22328 0
 22325 -22326  22327  663 -22329 0
 22325 -22326  22327  663  22330 0

c  1-1 --> 0
c    (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0 ∧ -p_663) -> (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧ -b^{221, 4}_0)
c  in CNF:
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_2
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_1
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_0
c  in DIMACS:
 22325  22326 -22327  663 -22328 0
 22325  22326 -22327  663 -22329 0
 22325  22326 -22327  663 -22330 0

c  0-1 --> -1
c    (-b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧ -p_663) -> ( b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0)
c  in CNF:
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨  b^{221, 4}_2
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_1
c     b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨  b^{221, 4}_0
c  in DIMACS:
 22325  22326  22327  663  22328 0
 22325  22326  22327  663 -22329 0
 22325  22326  22327  663  22330 0

c  -1-1 --> -2
c    ( b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧  b^{221, 3}_0 ∧ -p_663) -> ( b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0)
c  in CNF:
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨  b^{221, 4}_2
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨  b^{221, 4}_1
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨  p_663 ∨ -b^{221, 4}_0
c  in DIMACS:
-22325  22326 -22327  663  22328 0
-22325  22326 -22327  663  22329 0
-22325  22326 -22327  663 -22330 0

c  -2-1 --> break 
c    ( b^{221, 3}_2 ∧  b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧ -p_663) -> break
c  in CNF:
c    -b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨  b^{221, 3}_0 ∨  p_663 ∨ break
c  in DIMACS:
-22325 -22326  22327  663 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{221, 3}_2 ∧ -b^{221, 3}_1 ∧ -b^{221, 3}_0 ∧ true) 
c  in CNF:
c    -b^{221, 3}_2 ∨  b^{221, 3}_1 ∨  b^{221, 3}_0 ∨ false 
c  in DIMACS:
-22325  22326  22327  0

c  3 does not represent an automaton state.
c    -(-b^{221, 3}_2 ∧  b^{221, 3}_1 ∧  b^{221, 3}_0 ∧ true) 
c  in CNF:
c     b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ false 
c  in DIMACS:
 22325 -22326 -22327  0
c  -3 does not represent an automaton state.
c    -( b^{221, 3}_2 ∧  b^{221, 3}_1 ∧  b^{221, 3}_0 ∧ true) 
c  in CNF:
c    -b^{221, 3}_2 ∨ -b^{221, 3}_1 ∨ -b^{221, 3}_0 ∨ false 
c  in DIMACS:
-22325 -22326 -22327  0

c i = 4
c  -2+1 --> -1
c    ( b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧  p_884) -> ( b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0)
c  in CNF:
c    -b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨  b^{221, 5}_2
c    -b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_1
c    -b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨  b^{221, 5}_0
c  in DIMACS:
-22328 -22329  22330 -884  22331 0
-22328 -22329  22330 -884 -22332 0
-22328 -22329  22330 -884  22333 0

c  -1+1 --> 0
c    ( b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0 ∧  p_884) -> (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧ -b^{221, 5}_0)
c  in CNF:
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_2
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_1
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_0
c  in DIMACS:
-22328  22329 -22330 -884 -22331 0
-22328  22329 -22330 -884 -22332 0
-22328  22329 -22330 -884 -22333 0

c  0+1 --> 1
c    (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧  p_884) -> (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0)
c  in CNF:
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_2
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_1
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨  b^{221, 5}_0
c  in DIMACS:
 22328  22329  22330 -884 -22331 0
 22328  22329  22330 -884 -22332 0
 22328  22329  22330 -884  22333 0

c  1+1 --> 2
c    (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0 ∧  p_884) -> (-b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0)
c  in CNF:
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_2
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨  b^{221, 5}_1
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ -p_884 ∨ -b^{221, 5}_0
c  in DIMACS:
 22328  22329 -22330 -884 -22331 0
 22328  22329 -22330 -884  22332 0
 22328  22329 -22330 -884 -22333 0

c  2+1 --> break 
c    (-b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧  p_884) -> break
c  in CNF:
c     b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ -p_884 ∨ break
c  in DIMACS:
 22328 -22329  22330 -884 1162 0


c  2-1 --> 1
c    (-b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧ -p_884) -> (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0)
c  in CNF:
c     b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_2
c     b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_1
c     b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨  b^{221, 5}_0
c  in DIMACS:
 22328 -22329  22330  884 -22331 0
 22328 -22329  22330  884 -22332 0
 22328 -22329  22330  884  22333 0

c  1-1 --> 0
c    (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0 ∧ -p_884) -> (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧ -b^{221, 5}_0)
c  in CNF:
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_2
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_1
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_0
c  in DIMACS:
 22328  22329 -22330  884 -22331 0
 22328  22329 -22330  884 -22332 0
 22328  22329 -22330  884 -22333 0

c  0-1 --> -1
c    (-b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧ -p_884) -> ( b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0)
c  in CNF:
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨  b^{221, 5}_2
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_1
c     b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨  b^{221, 5}_0
c  in DIMACS:
 22328  22329  22330  884  22331 0
 22328  22329  22330  884 -22332 0
 22328  22329  22330  884  22333 0

c  -1-1 --> -2
c    ( b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧  b^{221, 4}_0 ∧ -p_884) -> ( b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0)
c  in CNF:
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨  b^{221, 5}_2
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨  b^{221, 5}_1
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨  p_884 ∨ -b^{221, 5}_0
c  in DIMACS:
-22328  22329 -22330  884  22331 0
-22328  22329 -22330  884  22332 0
-22328  22329 -22330  884 -22333 0

c  -2-1 --> break 
c    ( b^{221, 4}_2 ∧  b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧ -p_884) -> break
c  in CNF:
c    -b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨  b^{221, 4}_0 ∨  p_884 ∨ break
c  in DIMACS:
-22328 -22329  22330  884 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{221, 4}_2 ∧ -b^{221, 4}_1 ∧ -b^{221, 4}_0 ∧ true) 
c  in CNF:
c    -b^{221, 4}_2 ∨  b^{221, 4}_1 ∨  b^{221, 4}_0 ∨ false 
c  in DIMACS:
-22328  22329  22330  0

c  3 does not represent an automaton state.
c    -(-b^{221, 4}_2 ∧  b^{221, 4}_1 ∧  b^{221, 4}_0 ∧ true) 
c  in CNF:
c     b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ false 
c  in DIMACS:
 22328 -22329 -22330  0
c  -3 does not represent an automaton state.
c    -( b^{221, 4}_2 ∧  b^{221, 4}_1 ∧  b^{221, 4}_0 ∧ true) 
c  in CNF:
c    -b^{221, 4}_2 ∨ -b^{221, 4}_1 ∨ -b^{221, 4}_0 ∨ false 
c  in DIMACS:
-22328 -22329 -22330  0

c i = 5
c  -2+1 --> -1
c    ( b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧  p_1105) -> ( b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧  b^{221, 6}_0)
c  in CNF:
c    -b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨  b^{221, 6}_2
c    -b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_1
c    -b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨  b^{221, 6}_0
c  in DIMACS:
-22331 -22332  22333 -1105  22334 0
-22331 -22332  22333 -1105 -22335 0
-22331 -22332  22333 -1105  22336 0

c  -1+1 --> 0
c    ( b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0 ∧  p_1105) -> (-b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧ -b^{221, 6}_0)
c  in CNF:
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_2
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_1
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_0
c  in DIMACS:
-22331  22332 -22333 -1105 -22334 0
-22331  22332 -22333 -1105 -22335 0
-22331  22332 -22333 -1105 -22336 0

c  0+1 --> 1
c    (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧  p_1105) -> (-b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧  b^{221, 6}_0)
c  in CNF:
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_2
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_1
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨  b^{221, 6}_0
c  in DIMACS:
 22331  22332  22333 -1105 -22334 0
 22331  22332  22333 -1105 -22335 0
 22331  22332  22333 -1105  22336 0

c  1+1 --> 2
c    (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0 ∧  p_1105) -> (-b^{221, 6}_2 ∧  b^{221, 6}_1 ∧ -b^{221, 6}_0)
c  in CNF:
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_2
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨  b^{221, 6}_1
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ -p_1105 ∨ -b^{221, 6}_0
c  in DIMACS:
 22331  22332 -22333 -1105 -22334 0
 22331  22332 -22333 -1105  22335 0
 22331  22332 -22333 -1105 -22336 0

c  2+1 --> break 
c    (-b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧  p_1105) -> break
c  in CNF:
c     b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ -p_1105 ∨ break
c  in DIMACS:
 22331 -22332  22333 -1105 1162 0


c  2-1 --> 1
c    (-b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧ -p_1105) -> (-b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧  b^{221, 6}_0)
c  in CNF:
c     b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_2
c     b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_1
c     b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨  b^{221, 6}_0
c  in DIMACS:
 22331 -22332  22333  1105 -22334 0
 22331 -22332  22333  1105 -22335 0
 22331 -22332  22333  1105  22336 0

c  1-1 --> 0
c    (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0 ∧ -p_1105) -> (-b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧ -b^{221, 6}_0)
c  in CNF:
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_2
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_1
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_0
c  in DIMACS:
 22331  22332 -22333  1105 -22334 0
 22331  22332 -22333  1105 -22335 0
 22331  22332 -22333  1105 -22336 0

c  0-1 --> -1
c    (-b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧ -p_1105) -> ( b^{221, 6}_2 ∧ -b^{221, 6}_1 ∧  b^{221, 6}_0)
c  in CNF:
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨  b^{221, 6}_2
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_1
c     b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨  b^{221, 6}_0
c  in DIMACS:
 22331  22332  22333  1105  22334 0
 22331  22332  22333  1105 -22335 0
 22331  22332  22333  1105  22336 0

c  -1-1 --> -2
c    ( b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧  b^{221, 5}_0 ∧ -p_1105) -> ( b^{221, 6}_2 ∧  b^{221, 6}_1 ∧ -b^{221, 6}_0)
c  in CNF:
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨  b^{221, 6}_2
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨  b^{221, 6}_1
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨  p_1105 ∨ -b^{221, 6}_0
c  in DIMACS:
-22331  22332 -22333  1105  22334 0
-22331  22332 -22333  1105  22335 0
-22331  22332 -22333  1105 -22336 0

c  -2-1 --> break 
c    ( b^{221, 5}_2 ∧  b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧ -p_1105) -> break
c  in CNF:
c    -b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨  b^{221, 5}_0 ∨  p_1105 ∨ break
c  in DIMACS:
-22331 -22332  22333  1105 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{221, 5}_2 ∧ -b^{221, 5}_1 ∧ -b^{221, 5}_0 ∧ true) 
c  in CNF:
c    -b^{221, 5}_2 ∨  b^{221, 5}_1 ∨  b^{221, 5}_0 ∨ false 
c  in DIMACS:
-22331  22332  22333  0

c  3 does not represent an automaton state.
c    -(-b^{221, 5}_2 ∧  b^{221, 5}_1 ∧  b^{221, 5}_0 ∧ true) 
c  in CNF:
c     b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ false 
c  in DIMACS:
 22331 -22332 -22333  0
c  -3 does not represent an automaton state.
c    -( b^{221, 5}_2 ∧  b^{221, 5}_1 ∧  b^{221, 5}_0 ∧ true) 
c  in CNF:
c    -b^{221, 5}_2 ∨ -b^{221, 5}_1 ∨ -b^{221, 5}_0 ∨ false 
c  in DIMACS:
-22331 -22332 -22333  0

c INIT for k = 222
c    -b^{222, 1}_2
c    -b^{222, 1}_1
c    -b^{222, 1}_0
c  in DIMACS:
-22337 0
-22338 0
-22339 0

c Transitions for k = 222
c i = 1
c  -2+1 --> -1
c    ( b^{222, 1}_2 ∧  b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧  p_222) -> ( b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0)
c  in CNF:
c    -b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨  b^{222, 2}_2
c    -b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_1
c    -b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨  b^{222, 2}_0
c  in DIMACS:
-22337 -22338  22339 -222  22340 0
-22337 -22338  22339 -222 -22341 0
-22337 -22338  22339 -222  22342 0

c  -1+1 --> 0
c    ( b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧  b^{222, 1}_0 ∧  p_222) -> (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧ -b^{222, 2}_0)
c  in CNF:
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_2
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_1
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_0
c  in DIMACS:
-22337  22338 -22339 -222 -22340 0
-22337  22338 -22339 -222 -22341 0
-22337  22338 -22339 -222 -22342 0

c  0+1 --> 1
c    (-b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧  p_222) -> (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0)
c  in CNF:
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_2
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_1
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨  b^{222, 2}_0
c  in DIMACS:
 22337  22338  22339 -222 -22340 0
 22337  22338  22339 -222 -22341 0
 22337  22338  22339 -222  22342 0

c  1+1 --> 2
c    (-b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧  b^{222, 1}_0 ∧  p_222) -> (-b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0)
c  in CNF:
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_2
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨  b^{222, 2}_1
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ -p_222 ∨ -b^{222, 2}_0
c  in DIMACS:
 22337  22338 -22339 -222 -22340 0
 22337  22338 -22339 -222  22341 0
 22337  22338 -22339 -222 -22342 0

c  2+1 --> break 
c    (-b^{222, 1}_2 ∧  b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧  p_222) -> break
c  in CNF:
c     b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ -p_222 ∨ break
c  in DIMACS:
 22337 -22338  22339 -222 1162 0


c  2-1 --> 1
c    (-b^{222, 1}_2 ∧  b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧ -p_222) -> (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0)
c  in CNF:
c     b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_2
c     b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_1
c     b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨  b^{222, 2}_0
c  in DIMACS:
 22337 -22338  22339  222 -22340 0
 22337 -22338  22339  222 -22341 0
 22337 -22338  22339  222  22342 0

c  1-1 --> 0
c    (-b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧  b^{222, 1}_0 ∧ -p_222) -> (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧ -b^{222, 2}_0)
c  in CNF:
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_2
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_1
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_0
c  in DIMACS:
 22337  22338 -22339  222 -22340 0
 22337  22338 -22339  222 -22341 0
 22337  22338 -22339  222 -22342 0

c  0-1 --> -1
c    (-b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧ -p_222) -> ( b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0)
c  in CNF:
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨  b^{222, 2}_2
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_1
c     b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨  b^{222, 2}_0
c  in DIMACS:
 22337  22338  22339  222  22340 0
 22337  22338  22339  222 -22341 0
 22337  22338  22339  222  22342 0

c  -1-1 --> -2
c    ( b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧  b^{222, 1}_0 ∧ -p_222) -> ( b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0)
c  in CNF:
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨  b^{222, 2}_2
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨  b^{222, 2}_1
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨  p_222 ∨ -b^{222, 2}_0
c  in DIMACS:
-22337  22338 -22339  222  22340 0
-22337  22338 -22339  222  22341 0
-22337  22338 -22339  222 -22342 0

c  -2-1 --> break 
c    ( b^{222, 1}_2 ∧  b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧ -p_222) -> break
c  in CNF:
c    -b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨  b^{222, 1}_0 ∨  p_222 ∨ break
c  in DIMACS:
-22337 -22338  22339  222 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{222, 1}_2 ∧ -b^{222, 1}_1 ∧ -b^{222, 1}_0 ∧ true) 
c  in CNF:
c    -b^{222, 1}_2 ∨  b^{222, 1}_1 ∨  b^{222, 1}_0 ∨ false 
c  in DIMACS:
-22337  22338  22339  0

c  3 does not represent an automaton state.
c    -(-b^{222, 1}_2 ∧  b^{222, 1}_1 ∧  b^{222, 1}_0 ∧ true) 
c  in CNF:
c     b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ false 
c  in DIMACS:
 22337 -22338 -22339  0
c  -3 does not represent an automaton state.
c    -( b^{222, 1}_2 ∧  b^{222, 1}_1 ∧  b^{222, 1}_0 ∧ true) 
c  in CNF:
c    -b^{222, 1}_2 ∨ -b^{222, 1}_1 ∨ -b^{222, 1}_0 ∨ false 
c  in DIMACS:
-22337 -22338 -22339  0

c i = 2
c  -2+1 --> -1
c    ( b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧  p_444) -> ( b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0)
c  in CNF:
c    -b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨  b^{222, 3}_2
c    -b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_1
c    -b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨  b^{222, 3}_0
c  in DIMACS:
-22340 -22341  22342 -444  22343 0
-22340 -22341  22342 -444 -22344 0
-22340 -22341  22342 -444  22345 0

c  -1+1 --> 0
c    ( b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0 ∧  p_444) -> (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧ -b^{222, 3}_0)
c  in CNF:
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_2
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_1
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_0
c  in DIMACS:
-22340  22341 -22342 -444 -22343 0
-22340  22341 -22342 -444 -22344 0
-22340  22341 -22342 -444 -22345 0

c  0+1 --> 1
c    (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧  p_444) -> (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0)
c  in CNF:
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_2
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_1
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨  b^{222, 3}_0
c  in DIMACS:
 22340  22341  22342 -444 -22343 0
 22340  22341  22342 -444 -22344 0
 22340  22341  22342 -444  22345 0

c  1+1 --> 2
c    (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0 ∧  p_444) -> (-b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0)
c  in CNF:
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_2
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨  b^{222, 3}_1
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ -p_444 ∨ -b^{222, 3}_0
c  in DIMACS:
 22340  22341 -22342 -444 -22343 0
 22340  22341 -22342 -444  22344 0
 22340  22341 -22342 -444 -22345 0

c  2+1 --> break 
c    (-b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧  p_444) -> break
c  in CNF:
c     b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ -p_444 ∨ break
c  in DIMACS:
 22340 -22341  22342 -444 1162 0


c  2-1 --> 1
c    (-b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧ -p_444) -> (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0)
c  in CNF:
c     b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_2
c     b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_1
c     b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨  b^{222, 3}_0
c  in DIMACS:
 22340 -22341  22342  444 -22343 0
 22340 -22341  22342  444 -22344 0
 22340 -22341  22342  444  22345 0

c  1-1 --> 0
c    (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0 ∧ -p_444) -> (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧ -b^{222, 3}_0)
c  in CNF:
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_2
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_1
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_0
c  in DIMACS:
 22340  22341 -22342  444 -22343 0
 22340  22341 -22342  444 -22344 0
 22340  22341 -22342  444 -22345 0

c  0-1 --> -1
c    (-b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧ -p_444) -> ( b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0)
c  in CNF:
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨  b^{222, 3}_2
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_1
c     b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨  b^{222, 3}_0
c  in DIMACS:
 22340  22341  22342  444  22343 0
 22340  22341  22342  444 -22344 0
 22340  22341  22342  444  22345 0

c  -1-1 --> -2
c    ( b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧  b^{222, 2}_0 ∧ -p_444) -> ( b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0)
c  in CNF:
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨  b^{222, 3}_2
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨  b^{222, 3}_1
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨  p_444 ∨ -b^{222, 3}_0
c  in DIMACS:
-22340  22341 -22342  444  22343 0
-22340  22341 -22342  444  22344 0
-22340  22341 -22342  444 -22345 0

c  -2-1 --> break 
c    ( b^{222, 2}_2 ∧  b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧ -p_444) -> break
c  in CNF:
c    -b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨  b^{222, 2}_0 ∨  p_444 ∨ break
c  in DIMACS:
-22340 -22341  22342  444 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{222, 2}_2 ∧ -b^{222, 2}_1 ∧ -b^{222, 2}_0 ∧ true) 
c  in CNF:
c    -b^{222, 2}_2 ∨  b^{222, 2}_1 ∨  b^{222, 2}_0 ∨ false 
c  in DIMACS:
-22340  22341  22342  0

c  3 does not represent an automaton state.
c    -(-b^{222, 2}_2 ∧  b^{222, 2}_1 ∧  b^{222, 2}_0 ∧ true) 
c  in CNF:
c     b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ false 
c  in DIMACS:
 22340 -22341 -22342  0
c  -3 does not represent an automaton state.
c    -( b^{222, 2}_2 ∧  b^{222, 2}_1 ∧  b^{222, 2}_0 ∧ true) 
c  in CNF:
c    -b^{222, 2}_2 ∨ -b^{222, 2}_1 ∨ -b^{222, 2}_0 ∨ false 
c  in DIMACS:
-22340 -22341 -22342  0

c i = 3
c  -2+1 --> -1
c    ( b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧  p_666) -> ( b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0)
c  in CNF:
c    -b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨  b^{222, 4}_2
c    -b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_1
c    -b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨  b^{222, 4}_0
c  in DIMACS:
-22343 -22344  22345 -666  22346 0
-22343 -22344  22345 -666 -22347 0
-22343 -22344  22345 -666  22348 0

c  -1+1 --> 0
c    ( b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0 ∧  p_666) -> (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧ -b^{222, 4}_0)
c  in CNF:
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_2
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_1
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_0
c  in DIMACS:
-22343  22344 -22345 -666 -22346 0
-22343  22344 -22345 -666 -22347 0
-22343  22344 -22345 -666 -22348 0

c  0+1 --> 1
c    (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧  p_666) -> (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0)
c  in CNF:
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_2
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_1
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨  b^{222, 4}_0
c  in DIMACS:
 22343  22344  22345 -666 -22346 0
 22343  22344  22345 -666 -22347 0
 22343  22344  22345 -666  22348 0

c  1+1 --> 2
c    (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0 ∧  p_666) -> (-b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0)
c  in CNF:
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_2
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨  b^{222, 4}_1
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ -p_666 ∨ -b^{222, 4}_0
c  in DIMACS:
 22343  22344 -22345 -666 -22346 0
 22343  22344 -22345 -666  22347 0
 22343  22344 -22345 -666 -22348 0

c  2+1 --> break 
c    (-b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧  p_666) -> break
c  in CNF:
c     b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 22343 -22344  22345 -666 1162 0


c  2-1 --> 1
c    (-b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧ -p_666) -> (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0)
c  in CNF:
c     b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_2
c     b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_1
c     b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨  b^{222, 4}_0
c  in DIMACS:
 22343 -22344  22345  666 -22346 0
 22343 -22344  22345  666 -22347 0
 22343 -22344  22345  666  22348 0

c  1-1 --> 0
c    (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0 ∧ -p_666) -> (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧ -b^{222, 4}_0)
c  in CNF:
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_2
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_1
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_0
c  in DIMACS:
 22343  22344 -22345  666 -22346 0
 22343  22344 -22345  666 -22347 0
 22343  22344 -22345  666 -22348 0

c  0-1 --> -1
c    (-b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧ -p_666) -> ( b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0)
c  in CNF:
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨  b^{222, 4}_2
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_1
c     b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨  b^{222, 4}_0
c  in DIMACS:
 22343  22344  22345  666  22346 0
 22343  22344  22345  666 -22347 0
 22343  22344  22345  666  22348 0

c  -1-1 --> -2
c    ( b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧  b^{222, 3}_0 ∧ -p_666) -> ( b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0)
c  in CNF:
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨  b^{222, 4}_2
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨  b^{222, 4}_1
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨  p_666 ∨ -b^{222, 4}_0
c  in DIMACS:
-22343  22344 -22345  666  22346 0
-22343  22344 -22345  666  22347 0
-22343  22344 -22345  666 -22348 0

c  -2-1 --> break 
c    ( b^{222, 3}_2 ∧  b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨  b^{222, 3}_0 ∨  p_666 ∨ break
c  in DIMACS:
-22343 -22344  22345  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{222, 3}_2 ∧ -b^{222, 3}_1 ∧ -b^{222, 3}_0 ∧ true) 
c  in CNF:
c    -b^{222, 3}_2 ∨  b^{222, 3}_1 ∨  b^{222, 3}_0 ∨ false 
c  in DIMACS:
-22343  22344  22345  0

c  3 does not represent an automaton state.
c    -(-b^{222, 3}_2 ∧  b^{222, 3}_1 ∧  b^{222, 3}_0 ∧ true) 
c  in CNF:
c     b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ false 
c  in DIMACS:
 22343 -22344 -22345  0
c  -3 does not represent an automaton state.
c    -( b^{222, 3}_2 ∧  b^{222, 3}_1 ∧  b^{222, 3}_0 ∧ true) 
c  in CNF:
c    -b^{222, 3}_2 ∨ -b^{222, 3}_1 ∨ -b^{222, 3}_0 ∨ false 
c  in DIMACS:
-22343 -22344 -22345  0

c i = 4
c  -2+1 --> -1
c    ( b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧  p_888) -> ( b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0)
c  in CNF:
c    -b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨  b^{222, 5}_2
c    -b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_1
c    -b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨  b^{222, 5}_0
c  in DIMACS:
-22346 -22347  22348 -888  22349 0
-22346 -22347  22348 -888 -22350 0
-22346 -22347  22348 -888  22351 0

c  -1+1 --> 0
c    ( b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0 ∧  p_888) -> (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧ -b^{222, 5}_0)
c  in CNF:
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_2
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_1
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_0
c  in DIMACS:
-22346  22347 -22348 -888 -22349 0
-22346  22347 -22348 -888 -22350 0
-22346  22347 -22348 -888 -22351 0

c  0+1 --> 1
c    (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧  p_888) -> (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0)
c  in CNF:
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_2
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_1
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨  b^{222, 5}_0
c  in DIMACS:
 22346  22347  22348 -888 -22349 0
 22346  22347  22348 -888 -22350 0
 22346  22347  22348 -888  22351 0

c  1+1 --> 2
c    (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0 ∧  p_888) -> (-b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0)
c  in CNF:
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_2
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨  b^{222, 5}_1
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ -p_888 ∨ -b^{222, 5}_0
c  in DIMACS:
 22346  22347 -22348 -888 -22349 0
 22346  22347 -22348 -888  22350 0
 22346  22347 -22348 -888 -22351 0

c  2+1 --> break 
c    (-b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧  p_888) -> break
c  in CNF:
c     b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 22346 -22347  22348 -888 1162 0


c  2-1 --> 1
c    (-b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧ -p_888) -> (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0)
c  in CNF:
c     b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_2
c     b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_1
c     b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨  b^{222, 5}_0
c  in DIMACS:
 22346 -22347  22348  888 -22349 0
 22346 -22347  22348  888 -22350 0
 22346 -22347  22348  888  22351 0

c  1-1 --> 0
c    (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0 ∧ -p_888) -> (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧ -b^{222, 5}_0)
c  in CNF:
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_2
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_1
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_0
c  in DIMACS:
 22346  22347 -22348  888 -22349 0
 22346  22347 -22348  888 -22350 0
 22346  22347 -22348  888 -22351 0

c  0-1 --> -1
c    (-b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧ -p_888) -> ( b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0)
c  in CNF:
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨  b^{222, 5}_2
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_1
c     b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨  b^{222, 5}_0
c  in DIMACS:
 22346  22347  22348  888  22349 0
 22346  22347  22348  888 -22350 0
 22346  22347  22348  888  22351 0

c  -1-1 --> -2
c    ( b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧  b^{222, 4}_0 ∧ -p_888) -> ( b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0)
c  in CNF:
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨  b^{222, 5}_2
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨  b^{222, 5}_1
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨  p_888 ∨ -b^{222, 5}_0
c  in DIMACS:
-22346  22347 -22348  888  22349 0
-22346  22347 -22348  888  22350 0
-22346  22347 -22348  888 -22351 0

c  -2-1 --> break 
c    ( b^{222, 4}_2 ∧  b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨  b^{222, 4}_0 ∨  p_888 ∨ break
c  in DIMACS:
-22346 -22347  22348  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{222, 4}_2 ∧ -b^{222, 4}_1 ∧ -b^{222, 4}_0 ∧ true) 
c  in CNF:
c    -b^{222, 4}_2 ∨  b^{222, 4}_1 ∨  b^{222, 4}_0 ∨ false 
c  in DIMACS:
-22346  22347  22348  0

c  3 does not represent an automaton state.
c    -(-b^{222, 4}_2 ∧  b^{222, 4}_1 ∧  b^{222, 4}_0 ∧ true) 
c  in CNF:
c     b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ false 
c  in DIMACS:
 22346 -22347 -22348  0
c  -3 does not represent an automaton state.
c    -( b^{222, 4}_2 ∧  b^{222, 4}_1 ∧  b^{222, 4}_0 ∧ true) 
c  in CNF:
c    -b^{222, 4}_2 ∨ -b^{222, 4}_1 ∨ -b^{222, 4}_0 ∨ false 
c  in DIMACS:
-22346 -22347 -22348  0

c i = 5
c  -2+1 --> -1
c    ( b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧  p_1110) -> ( b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧  b^{222, 6}_0)
c  in CNF:
c    -b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨  b^{222, 6}_2
c    -b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_1
c    -b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨  b^{222, 6}_0
c  in DIMACS:
-22349 -22350  22351 -1110  22352 0
-22349 -22350  22351 -1110 -22353 0
-22349 -22350  22351 -1110  22354 0

c  -1+1 --> 0
c    ( b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0 ∧  p_1110) -> (-b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧ -b^{222, 6}_0)
c  in CNF:
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_2
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_1
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_0
c  in DIMACS:
-22349  22350 -22351 -1110 -22352 0
-22349  22350 -22351 -1110 -22353 0
-22349  22350 -22351 -1110 -22354 0

c  0+1 --> 1
c    (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧  p_1110) -> (-b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧  b^{222, 6}_0)
c  in CNF:
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_2
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_1
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨  b^{222, 6}_0
c  in DIMACS:
 22349  22350  22351 -1110 -22352 0
 22349  22350  22351 -1110 -22353 0
 22349  22350  22351 -1110  22354 0

c  1+1 --> 2
c    (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0 ∧  p_1110) -> (-b^{222, 6}_2 ∧  b^{222, 6}_1 ∧ -b^{222, 6}_0)
c  in CNF:
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_2
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨  b^{222, 6}_1
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ -p_1110 ∨ -b^{222, 6}_0
c  in DIMACS:
 22349  22350 -22351 -1110 -22352 0
 22349  22350 -22351 -1110  22353 0
 22349  22350 -22351 -1110 -22354 0

c  2+1 --> break 
c    (-b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 22349 -22350  22351 -1110 1162 0


c  2-1 --> 1
c    (-b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧ -p_1110) -> (-b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧  b^{222, 6}_0)
c  in CNF:
c     b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_2
c     b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_1
c     b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨  b^{222, 6}_0
c  in DIMACS:
 22349 -22350  22351  1110 -22352 0
 22349 -22350  22351  1110 -22353 0
 22349 -22350  22351  1110  22354 0

c  1-1 --> 0
c    (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0 ∧ -p_1110) -> (-b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧ -b^{222, 6}_0)
c  in CNF:
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_2
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_1
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_0
c  in DIMACS:
 22349  22350 -22351  1110 -22352 0
 22349  22350 -22351  1110 -22353 0
 22349  22350 -22351  1110 -22354 0

c  0-1 --> -1
c    (-b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧ -p_1110) -> ( b^{222, 6}_2 ∧ -b^{222, 6}_1 ∧  b^{222, 6}_0)
c  in CNF:
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨  b^{222, 6}_2
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_1
c     b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨  b^{222, 6}_0
c  in DIMACS:
 22349  22350  22351  1110  22352 0
 22349  22350  22351  1110 -22353 0
 22349  22350  22351  1110  22354 0

c  -1-1 --> -2
c    ( b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧  b^{222, 5}_0 ∧ -p_1110) -> ( b^{222, 6}_2 ∧  b^{222, 6}_1 ∧ -b^{222, 6}_0)
c  in CNF:
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨  b^{222, 6}_2
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨  b^{222, 6}_1
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨  p_1110 ∨ -b^{222, 6}_0
c  in DIMACS:
-22349  22350 -22351  1110  22352 0
-22349  22350 -22351  1110  22353 0
-22349  22350 -22351  1110 -22354 0

c  -2-1 --> break 
c    ( b^{222, 5}_2 ∧  b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨  b^{222, 5}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-22349 -22350  22351  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{222, 5}_2 ∧ -b^{222, 5}_1 ∧ -b^{222, 5}_0 ∧ true) 
c  in CNF:
c    -b^{222, 5}_2 ∨  b^{222, 5}_1 ∨  b^{222, 5}_0 ∨ false 
c  in DIMACS:
-22349  22350  22351  0

c  3 does not represent an automaton state.
c    -(-b^{222, 5}_2 ∧  b^{222, 5}_1 ∧  b^{222, 5}_0 ∧ true) 
c  in CNF:
c     b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ false 
c  in DIMACS:
 22349 -22350 -22351  0
c  -3 does not represent an automaton state.
c    -( b^{222, 5}_2 ∧  b^{222, 5}_1 ∧  b^{222, 5}_0 ∧ true) 
c  in CNF:
c    -b^{222, 5}_2 ∨ -b^{222, 5}_1 ∨ -b^{222, 5}_0 ∨ false 
c  in DIMACS:
-22349 -22350 -22351  0

c INIT for k = 223
c    -b^{223, 1}_2
c    -b^{223, 1}_1
c    -b^{223, 1}_0
c  in DIMACS:
-22355 0
-22356 0
-22357 0

c Transitions for k = 223
c i = 1
c  -2+1 --> -1
c    ( b^{223, 1}_2 ∧  b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧  p_223) -> ( b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0)
c  in CNF:
c    -b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨  b^{223, 2}_2
c    -b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_1
c    -b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨  b^{223, 2}_0
c  in DIMACS:
-22355 -22356  22357 -223  22358 0
-22355 -22356  22357 -223 -22359 0
-22355 -22356  22357 -223  22360 0

c  -1+1 --> 0
c    ( b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧  b^{223, 1}_0 ∧  p_223) -> (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧ -b^{223, 2}_0)
c  in CNF:
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_2
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_1
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_0
c  in DIMACS:
-22355  22356 -22357 -223 -22358 0
-22355  22356 -22357 -223 -22359 0
-22355  22356 -22357 -223 -22360 0

c  0+1 --> 1
c    (-b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧  p_223) -> (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0)
c  in CNF:
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_2
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_1
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨  b^{223, 2}_0
c  in DIMACS:
 22355  22356  22357 -223 -22358 0
 22355  22356  22357 -223 -22359 0
 22355  22356  22357 -223  22360 0

c  1+1 --> 2
c    (-b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧  b^{223, 1}_0 ∧  p_223) -> (-b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0)
c  in CNF:
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_2
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨  b^{223, 2}_1
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ -p_223 ∨ -b^{223, 2}_0
c  in DIMACS:
 22355  22356 -22357 -223 -22358 0
 22355  22356 -22357 -223  22359 0
 22355  22356 -22357 -223 -22360 0

c  2+1 --> break 
c    (-b^{223, 1}_2 ∧  b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧  p_223) -> break
c  in CNF:
c     b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ -p_223 ∨ break
c  in DIMACS:
 22355 -22356  22357 -223 1162 0


c  2-1 --> 1
c    (-b^{223, 1}_2 ∧  b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧ -p_223) -> (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0)
c  in CNF:
c     b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_2
c     b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_1
c     b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨  b^{223, 2}_0
c  in DIMACS:
 22355 -22356  22357  223 -22358 0
 22355 -22356  22357  223 -22359 0
 22355 -22356  22357  223  22360 0

c  1-1 --> 0
c    (-b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧  b^{223, 1}_0 ∧ -p_223) -> (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧ -b^{223, 2}_0)
c  in CNF:
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_2
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_1
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_0
c  in DIMACS:
 22355  22356 -22357  223 -22358 0
 22355  22356 -22357  223 -22359 0
 22355  22356 -22357  223 -22360 0

c  0-1 --> -1
c    (-b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧ -p_223) -> ( b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0)
c  in CNF:
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨  b^{223, 2}_2
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_1
c     b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨  b^{223, 2}_0
c  in DIMACS:
 22355  22356  22357  223  22358 0
 22355  22356  22357  223 -22359 0
 22355  22356  22357  223  22360 0

c  -1-1 --> -2
c    ( b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧  b^{223, 1}_0 ∧ -p_223) -> ( b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0)
c  in CNF:
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨  b^{223, 2}_2
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨  b^{223, 2}_1
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨  p_223 ∨ -b^{223, 2}_0
c  in DIMACS:
-22355  22356 -22357  223  22358 0
-22355  22356 -22357  223  22359 0
-22355  22356 -22357  223 -22360 0

c  -2-1 --> break 
c    ( b^{223, 1}_2 ∧  b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧ -p_223) -> break
c  in CNF:
c    -b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨  b^{223, 1}_0 ∨  p_223 ∨ break
c  in DIMACS:
-22355 -22356  22357  223 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{223, 1}_2 ∧ -b^{223, 1}_1 ∧ -b^{223, 1}_0 ∧ true) 
c  in CNF:
c    -b^{223, 1}_2 ∨  b^{223, 1}_1 ∨  b^{223, 1}_0 ∨ false 
c  in DIMACS:
-22355  22356  22357  0

c  3 does not represent an automaton state.
c    -(-b^{223, 1}_2 ∧  b^{223, 1}_1 ∧  b^{223, 1}_0 ∧ true) 
c  in CNF:
c     b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ false 
c  in DIMACS:
 22355 -22356 -22357  0
c  -3 does not represent an automaton state.
c    -( b^{223, 1}_2 ∧  b^{223, 1}_1 ∧  b^{223, 1}_0 ∧ true) 
c  in CNF:
c    -b^{223, 1}_2 ∨ -b^{223, 1}_1 ∨ -b^{223, 1}_0 ∨ false 
c  in DIMACS:
-22355 -22356 -22357  0

c i = 2
c  -2+1 --> -1
c    ( b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧  p_446) -> ( b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0)
c  in CNF:
c    -b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨  b^{223, 3}_2
c    -b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_1
c    -b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨  b^{223, 3}_0
c  in DIMACS:
-22358 -22359  22360 -446  22361 0
-22358 -22359  22360 -446 -22362 0
-22358 -22359  22360 -446  22363 0

c  -1+1 --> 0
c    ( b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0 ∧  p_446) -> (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧ -b^{223, 3}_0)
c  in CNF:
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_2
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_1
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_0
c  in DIMACS:
-22358  22359 -22360 -446 -22361 0
-22358  22359 -22360 -446 -22362 0
-22358  22359 -22360 -446 -22363 0

c  0+1 --> 1
c    (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧  p_446) -> (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0)
c  in CNF:
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_2
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_1
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨  b^{223, 3}_0
c  in DIMACS:
 22358  22359  22360 -446 -22361 0
 22358  22359  22360 -446 -22362 0
 22358  22359  22360 -446  22363 0

c  1+1 --> 2
c    (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0 ∧  p_446) -> (-b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0)
c  in CNF:
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_2
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨  b^{223, 3}_1
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ -p_446 ∨ -b^{223, 3}_0
c  in DIMACS:
 22358  22359 -22360 -446 -22361 0
 22358  22359 -22360 -446  22362 0
 22358  22359 -22360 -446 -22363 0

c  2+1 --> break 
c    (-b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧  p_446) -> break
c  in CNF:
c     b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ -p_446 ∨ break
c  in DIMACS:
 22358 -22359  22360 -446 1162 0


c  2-1 --> 1
c    (-b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧ -p_446) -> (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0)
c  in CNF:
c     b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_2
c     b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_1
c     b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨  b^{223, 3}_0
c  in DIMACS:
 22358 -22359  22360  446 -22361 0
 22358 -22359  22360  446 -22362 0
 22358 -22359  22360  446  22363 0

c  1-1 --> 0
c    (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0 ∧ -p_446) -> (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧ -b^{223, 3}_0)
c  in CNF:
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_2
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_1
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_0
c  in DIMACS:
 22358  22359 -22360  446 -22361 0
 22358  22359 -22360  446 -22362 0
 22358  22359 -22360  446 -22363 0

c  0-1 --> -1
c    (-b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧ -p_446) -> ( b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0)
c  in CNF:
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨  b^{223, 3}_2
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_1
c     b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨  b^{223, 3}_0
c  in DIMACS:
 22358  22359  22360  446  22361 0
 22358  22359  22360  446 -22362 0
 22358  22359  22360  446  22363 0

c  -1-1 --> -2
c    ( b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧  b^{223, 2}_0 ∧ -p_446) -> ( b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0)
c  in CNF:
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨  b^{223, 3}_2
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨  b^{223, 3}_1
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨  p_446 ∨ -b^{223, 3}_0
c  in DIMACS:
-22358  22359 -22360  446  22361 0
-22358  22359 -22360  446  22362 0
-22358  22359 -22360  446 -22363 0

c  -2-1 --> break 
c    ( b^{223, 2}_2 ∧  b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧ -p_446) -> break
c  in CNF:
c    -b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨  b^{223, 2}_0 ∨  p_446 ∨ break
c  in DIMACS:
-22358 -22359  22360  446 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{223, 2}_2 ∧ -b^{223, 2}_1 ∧ -b^{223, 2}_0 ∧ true) 
c  in CNF:
c    -b^{223, 2}_2 ∨  b^{223, 2}_1 ∨  b^{223, 2}_0 ∨ false 
c  in DIMACS:
-22358  22359  22360  0

c  3 does not represent an automaton state.
c    -(-b^{223, 2}_2 ∧  b^{223, 2}_1 ∧  b^{223, 2}_0 ∧ true) 
c  in CNF:
c     b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ false 
c  in DIMACS:
 22358 -22359 -22360  0
c  -3 does not represent an automaton state.
c    -( b^{223, 2}_2 ∧  b^{223, 2}_1 ∧  b^{223, 2}_0 ∧ true) 
c  in CNF:
c    -b^{223, 2}_2 ∨ -b^{223, 2}_1 ∨ -b^{223, 2}_0 ∨ false 
c  in DIMACS:
-22358 -22359 -22360  0

c i = 3
c  -2+1 --> -1
c    ( b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧  p_669) -> ( b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0)
c  in CNF:
c    -b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨  b^{223, 4}_2
c    -b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_1
c    -b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨  b^{223, 4}_0
c  in DIMACS:
-22361 -22362  22363 -669  22364 0
-22361 -22362  22363 -669 -22365 0
-22361 -22362  22363 -669  22366 0

c  -1+1 --> 0
c    ( b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0 ∧  p_669) -> (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧ -b^{223, 4}_0)
c  in CNF:
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_2
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_1
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_0
c  in DIMACS:
-22361  22362 -22363 -669 -22364 0
-22361  22362 -22363 -669 -22365 0
-22361  22362 -22363 -669 -22366 0

c  0+1 --> 1
c    (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧  p_669) -> (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0)
c  in CNF:
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_2
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_1
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨  b^{223, 4}_0
c  in DIMACS:
 22361  22362  22363 -669 -22364 0
 22361  22362  22363 -669 -22365 0
 22361  22362  22363 -669  22366 0

c  1+1 --> 2
c    (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0 ∧  p_669) -> (-b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0)
c  in CNF:
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_2
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨  b^{223, 4}_1
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ -p_669 ∨ -b^{223, 4}_0
c  in DIMACS:
 22361  22362 -22363 -669 -22364 0
 22361  22362 -22363 -669  22365 0
 22361  22362 -22363 -669 -22366 0

c  2+1 --> break 
c    (-b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧  p_669) -> break
c  in CNF:
c     b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ -p_669 ∨ break
c  in DIMACS:
 22361 -22362  22363 -669 1162 0


c  2-1 --> 1
c    (-b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧ -p_669) -> (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0)
c  in CNF:
c     b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_2
c     b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_1
c     b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨  b^{223, 4}_0
c  in DIMACS:
 22361 -22362  22363  669 -22364 0
 22361 -22362  22363  669 -22365 0
 22361 -22362  22363  669  22366 0

c  1-1 --> 0
c    (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0 ∧ -p_669) -> (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧ -b^{223, 4}_0)
c  in CNF:
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_2
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_1
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_0
c  in DIMACS:
 22361  22362 -22363  669 -22364 0
 22361  22362 -22363  669 -22365 0
 22361  22362 -22363  669 -22366 0

c  0-1 --> -1
c    (-b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧ -p_669) -> ( b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0)
c  in CNF:
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨  b^{223, 4}_2
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_1
c     b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨  b^{223, 4}_0
c  in DIMACS:
 22361  22362  22363  669  22364 0
 22361  22362  22363  669 -22365 0
 22361  22362  22363  669  22366 0

c  -1-1 --> -2
c    ( b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧  b^{223, 3}_0 ∧ -p_669) -> ( b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0)
c  in CNF:
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨  b^{223, 4}_2
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨  b^{223, 4}_1
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨  p_669 ∨ -b^{223, 4}_0
c  in DIMACS:
-22361  22362 -22363  669  22364 0
-22361  22362 -22363  669  22365 0
-22361  22362 -22363  669 -22366 0

c  -2-1 --> break 
c    ( b^{223, 3}_2 ∧  b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧ -p_669) -> break
c  in CNF:
c    -b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨  b^{223, 3}_0 ∨  p_669 ∨ break
c  in DIMACS:
-22361 -22362  22363  669 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{223, 3}_2 ∧ -b^{223, 3}_1 ∧ -b^{223, 3}_0 ∧ true) 
c  in CNF:
c    -b^{223, 3}_2 ∨  b^{223, 3}_1 ∨  b^{223, 3}_0 ∨ false 
c  in DIMACS:
-22361  22362  22363  0

c  3 does not represent an automaton state.
c    -(-b^{223, 3}_2 ∧  b^{223, 3}_1 ∧  b^{223, 3}_0 ∧ true) 
c  in CNF:
c     b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ false 
c  in DIMACS:
 22361 -22362 -22363  0
c  -3 does not represent an automaton state.
c    -( b^{223, 3}_2 ∧  b^{223, 3}_1 ∧  b^{223, 3}_0 ∧ true) 
c  in CNF:
c    -b^{223, 3}_2 ∨ -b^{223, 3}_1 ∨ -b^{223, 3}_0 ∨ false 
c  in DIMACS:
-22361 -22362 -22363  0

c i = 4
c  -2+1 --> -1
c    ( b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧  p_892) -> ( b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0)
c  in CNF:
c    -b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨  b^{223, 5}_2
c    -b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_1
c    -b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨  b^{223, 5}_0
c  in DIMACS:
-22364 -22365  22366 -892  22367 0
-22364 -22365  22366 -892 -22368 0
-22364 -22365  22366 -892  22369 0

c  -1+1 --> 0
c    ( b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0 ∧  p_892) -> (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧ -b^{223, 5}_0)
c  in CNF:
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_2
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_1
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_0
c  in DIMACS:
-22364  22365 -22366 -892 -22367 0
-22364  22365 -22366 -892 -22368 0
-22364  22365 -22366 -892 -22369 0

c  0+1 --> 1
c    (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧  p_892) -> (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0)
c  in CNF:
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_2
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_1
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨  b^{223, 5}_0
c  in DIMACS:
 22364  22365  22366 -892 -22367 0
 22364  22365  22366 -892 -22368 0
 22364  22365  22366 -892  22369 0

c  1+1 --> 2
c    (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0 ∧  p_892) -> (-b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0)
c  in CNF:
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_2
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨  b^{223, 5}_1
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ -p_892 ∨ -b^{223, 5}_0
c  in DIMACS:
 22364  22365 -22366 -892 -22367 0
 22364  22365 -22366 -892  22368 0
 22364  22365 -22366 -892 -22369 0

c  2+1 --> break 
c    (-b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧  p_892) -> break
c  in CNF:
c     b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ -p_892 ∨ break
c  in DIMACS:
 22364 -22365  22366 -892 1162 0


c  2-1 --> 1
c    (-b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧ -p_892) -> (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0)
c  in CNF:
c     b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_2
c     b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_1
c     b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨  b^{223, 5}_0
c  in DIMACS:
 22364 -22365  22366  892 -22367 0
 22364 -22365  22366  892 -22368 0
 22364 -22365  22366  892  22369 0

c  1-1 --> 0
c    (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0 ∧ -p_892) -> (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧ -b^{223, 5}_0)
c  in CNF:
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_2
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_1
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_0
c  in DIMACS:
 22364  22365 -22366  892 -22367 0
 22364  22365 -22366  892 -22368 0
 22364  22365 -22366  892 -22369 0

c  0-1 --> -1
c    (-b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧ -p_892) -> ( b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0)
c  in CNF:
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨  b^{223, 5}_2
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_1
c     b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨  b^{223, 5}_0
c  in DIMACS:
 22364  22365  22366  892  22367 0
 22364  22365  22366  892 -22368 0
 22364  22365  22366  892  22369 0

c  -1-1 --> -2
c    ( b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧  b^{223, 4}_0 ∧ -p_892) -> ( b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0)
c  in CNF:
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨  b^{223, 5}_2
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨  b^{223, 5}_1
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨  p_892 ∨ -b^{223, 5}_0
c  in DIMACS:
-22364  22365 -22366  892  22367 0
-22364  22365 -22366  892  22368 0
-22364  22365 -22366  892 -22369 0

c  -2-1 --> break 
c    ( b^{223, 4}_2 ∧  b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧ -p_892) -> break
c  in CNF:
c    -b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨  b^{223, 4}_0 ∨  p_892 ∨ break
c  in DIMACS:
-22364 -22365  22366  892 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{223, 4}_2 ∧ -b^{223, 4}_1 ∧ -b^{223, 4}_0 ∧ true) 
c  in CNF:
c    -b^{223, 4}_2 ∨  b^{223, 4}_1 ∨  b^{223, 4}_0 ∨ false 
c  in DIMACS:
-22364  22365  22366  0

c  3 does not represent an automaton state.
c    -(-b^{223, 4}_2 ∧  b^{223, 4}_1 ∧  b^{223, 4}_0 ∧ true) 
c  in CNF:
c     b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ false 
c  in DIMACS:
 22364 -22365 -22366  0
c  -3 does not represent an automaton state.
c    -( b^{223, 4}_2 ∧  b^{223, 4}_1 ∧  b^{223, 4}_0 ∧ true) 
c  in CNF:
c    -b^{223, 4}_2 ∨ -b^{223, 4}_1 ∨ -b^{223, 4}_0 ∨ false 
c  in DIMACS:
-22364 -22365 -22366  0

c i = 5
c  -2+1 --> -1
c    ( b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧  p_1115) -> ( b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧  b^{223, 6}_0)
c  in CNF:
c    -b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨  b^{223, 6}_2
c    -b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_1
c    -b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨  b^{223, 6}_0
c  in DIMACS:
-22367 -22368  22369 -1115  22370 0
-22367 -22368  22369 -1115 -22371 0
-22367 -22368  22369 -1115  22372 0

c  -1+1 --> 0
c    ( b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0 ∧  p_1115) -> (-b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧ -b^{223, 6}_0)
c  in CNF:
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_2
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_1
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_0
c  in DIMACS:
-22367  22368 -22369 -1115 -22370 0
-22367  22368 -22369 -1115 -22371 0
-22367  22368 -22369 -1115 -22372 0

c  0+1 --> 1
c    (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧  p_1115) -> (-b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧  b^{223, 6}_0)
c  in CNF:
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_2
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_1
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨  b^{223, 6}_0
c  in DIMACS:
 22367  22368  22369 -1115 -22370 0
 22367  22368  22369 -1115 -22371 0
 22367  22368  22369 -1115  22372 0

c  1+1 --> 2
c    (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0 ∧  p_1115) -> (-b^{223, 6}_2 ∧  b^{223, 6}_1 ∧ -b^{223, 6}_0)
c  in CNF:
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_2
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨  b^{223, 6}_1
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ -p_1115 ∨ -b^{223, 6}_0
c  in DIMACS:
 22367  22368 -22369 -1115 -22370 0
 22367  22368 -22369 -1115  22371 0
 22367  22368 -22369 -1115 -22372 0

c  2+1 --> break 
c    (-b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧  p_1115) -> break
c  in CNF:
c     b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ -p_1115 ∨ break
c  in DIMACS:
 22367 -22368  22369 -1115 1162 0


c  2-1 --> 1
c    (-b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧ -p_1115) -> (-b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧  b^{223, 6}_0)
c  in CNF:
c     b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_2
c     b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_1
c     b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨  b^{223, 6}_0
c  in DIMACS:
 22367 -22368  22369  1115 -22370 0
 22367 -22368  22369  1115 -22371 0
 22367 -22368  22369  1115  22372 0

c  1-1 --> 0
c    (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0 ∧ -p_1115) -> (-b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧ -b^{223, 6}_0)
c  in CNF:
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_2
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_1
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_0
c  in DIMACS:
 22367  22368 -22369  1115 -22370 0
 22367  22368 -22369  1115 -22371 0
 22367  22368 -22369  1115 -22372 0

c  0-1 --> -1
c    (-b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧ -p_1115) -> ( b^{223, 6}_2 ∧ -b^{223, 6}_1 ∧  b^{223, 6}_0)
c  in CNF:
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨  b^{223, 6}_2
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_1
c     b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨  b^{223, 6}_0
c  in DIMACS:
 22367  22368  22369  1115  22370 0
 22367  22368  22369  1115 -22371 0
 22367  22368  22369  1115  22372 0

c  -1-1 --> -2
c    ( b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧  b^{223, 5}_0 ∧ -p_1115) -> ( b^{223, 6}_2 ∧  b^{223, 6}_1 ∧ -b^{223, 6}_0)
c  in CNF:
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨  b^{223, 6}_2
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨  b^{223, 6}_1
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨  p_1115 ∨ -b^{223, 6}_0
c  in DIMACS:
-22367  22368 -22369  1115  22370 0
-22367  22368 -22369  1115  22371 0
-22367  22368 -22369  1115 -22372 0

c  -2-1 --> break 
c    ( b^{223, 5}_2 ∧  b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧ -p_1115) -> break
c  in CNF:
c    -b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨  b^{223, 5}_0 ∨  p_1115 ∨ break
c  in DIMACS:
-22367 -22368  22369  1115 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{223, 5}_2 ∧ -b^{223, 5}_1 ∧ -b^{223, 5}_0 ∧ true) 
c  in CNF:
c    -b^{223, 5}_2 ∨  b^{223, 5}_1 ∨  b^{223, 5}_0 ∨ false 
c  in DIMACS:
-22367  22368  22369  0

c  3 does not represent an automaton state.
c    -(-b^{223, 5}_2 ∧  b^{223, 5}_1 ∧  b^{223, 5}_0 ∧ true) 
c  in CNF:
c     b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ false 
c  in DIMACS:
 22367 -22368 -22369  0
c  -3 does not represent an automaton state.
c    -( b^{223, 5}_2 ∧  b^{223, 5}_1 ∧  b^{223, 5}_0 ∧ true) 
c  in CNF:
c    -b^{223, 5}_2 ∨ -b^{223, 5}_1 ∨ -b^{223, 5}_0 ∨ false 
c  in DIMACS:
-22367 -22368 -22369  0

c INIT for k = 224
c    -b^{224, 1}_2
c    -b^{224, 1}_1
c    -b^{224, 1}_0
c  in DIMACS:
-22373 0
-22374 0
-22375 0

c Transitions for k = 224
c i = 1
c  -2+1 --> -1
c    ( b^{224, 1}_2 ∧  b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧  p_224) -> ( b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0)
c  in CNF:
c    -b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨  b^{224, 2}_2
c    -b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_1
c    -b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨  b^{224, 2}_0
c  in DIMACS:
-22373 -22374  22375 -224  22376 0
-22373 -22374  22375 -224 -22377 0
-22373 -22374  22375 -224  22378 0

c  -1+1 --> 0
c    ( b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧  b^{224, 1}_0 ∧  p_224) -> (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧ -b^{224, 2}_0)
c  in CNF:
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_2
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_1
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_0
c  in DIMACS:
-22373  22374 -22375 -224 -22376 0
-22373  22374 -22375 -224 -22377 0
-22373  22374 -22375 -224 -22378 0

c  0+1 --> 1
c    (-b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧  p_224) -> (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0)
c  in CNF:
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_2
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_1
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨  b^{224, 2}_0
c  in DIMACS:
 22373  22374  22375 -224 -22376 0
 22373  22374  22375 -224 -22377 0
 22373  22374  22375 -224  22378 0

c  1+1 --> 2
c    (-b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧  b^{224, 1}_0 ∧  p_224) -> (-b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0)
c  in CNF:
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_2
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨  b^{224, 2}_1
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ -p_224 ∨ -b^{224, 2}_0
c  in DIMACS:
 22373  22374 -22375 -224 -22376 0
 22373  22374 -22375 -224  22377 0
 22373  22374 -22375 -224 -22378 0

c  2+1 --> break 
c    (-b^{224, 1}_2 ∧  b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧  p_224) -> break
c  in CNF:
c     b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ -p_224 ∨ break
c  in DIMACS:
 22373 -22374  22375 -224 1162 0


c  2-1 --> 1
c    (-b^{224, 1}_2 ∧  b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧ -p_224) -> (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0)
c  in CNF:
c     b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_2
c     b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_1
c     b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨  b^{224, 2}_0
c  in DIMACS:
 22373 -22374  22375  224 -22376 0
 22373 -22374  22375  224 -22377 0
 22373 -22374  22375  224  22378 0

c  1-1 --> 0
c    (-b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧  b^{224, 1}_0 ∧ -p_224) -> (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧ -b^{224, 2}_0)
c  in CNF:
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_2
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_1
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_0
c  in DIMACS:
 22373  22374 -22375  224 -22376 0
 22373  22374 -22375  224 -22377 0
 22373  22374 -22375  224 -22378 0

c  0-1 --> -1
c    (-b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧ -p_224) -> ( b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0)
c  in CNF:
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨  b^{224, 2}_2
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_1
c     b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨  b^{224, 2}_0
c  in DIMACS:
 22373  22374  22375  224  22376 0
 22373  22374  22375  224 -22377 0
 22373  22374  22375  224  22378 0

c  -1-1 --> -2
c    ( b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧  b^{224, 1}_0 ∧ -p_224) -> ( b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0)
c  in CNF:
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨  b^{224, 2}_2
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨  b^{224, 2}_1
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨  p_224 ∨ -b^{224, 2}_0
c  in DIMACS:
-22373  22374 -22375  224  22376 0
-22373  22374 -22375  224  22377 0
-22373  22374 -22375  224 -22378 0

c  -2-1 --> break 
c    ( b^{224, 1}_2 ∧  b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧ -p_224) -> break
c  in CNF:
c    -b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨  b^{224, 1}_0 ∨  p_224 ∨ break
c  in DIMACS:
-22373 -22374  22375  224 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{224, 1}_2 ∧ -b^{224, 1}_1 ∧ -b^{224, 1}_0 ∧ true) 
c  in CNF:
c    -b^{224, 1}_2 ∨  b^{224, 1}_1 ∨  b^{224, 1}_0 ∨ false 
c  in DIMACS:
-22373  22374  22375  0

c  3 does not represent an automaton state.
c    -(-b^{224, 1}_2 ∧  b^{224, 1}_1 ∧  b^{224, 1}_0 ∧ true) 
c  in CNF:
c     b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ false 
c  in DIMACS:
 22373 -22374 -22375  0
c  -3 does not represent an automaton state.
c    -( b^{224, 1}_2 ∧  b^{224, 1}_1 ∧  b^{224, 1}_0 ∧ true) 
c  in CNF:
c    -b^{224, 1}_2 ∨ -b^{224, 1}_1 ∨ -b^{224, 1}_0 ∨ false 
c  in DIMACS:
-22373 -22374 -22375  0

c i = 2
c  -2+1 --> -1
c    ( b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧  p_448) -> ( b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0)
c  in CNF:
c    -b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨  b^{224, 3}_2
c    -b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_1
c    -b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨  b^{224, 3}_0
c  in DIMACS:
-22376 -22377  22378 -448  22379 0
-22376 -22377  22378 -448 -22380 0
-22376 -22377  22378 -448  22381 0

c  -1+1 --> 0
c    ( b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0 ∧  p_448) -> (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧ -b^{224, 3}_0)
c  in CNF:
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_2
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_1
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_0
c  in DIMACS:
-22376  22377 -22378 -448 -22379 0
-22376  22377 -22378 -448 -22380 0
-22376  22377 -22378 -448 -22381 0

c  0+1 --> 1
c    (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧  p_448) -> (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0)
c  in CNF:
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_2
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_1
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨  b^{224, 3}_0
c  in DIMACS:
 22376  22377  22378 -448 -22379 0
 22376  22377  22378 -448 -22380 0
 22376  22377  22378 -448  22381 0

c  1+1 --> 2
c    (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0 ∧  p_448) -> (-b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0)
c  in CNF:
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_2
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨  b^{224, 3}_1
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ -p_448 ∨ -b^{224, 3}_0
c  in DIMACS:
 22376  22377 -22378 -448 -22379 0
 22376  22377 -22378 -448  22380 0
 22376  22377 -22378 -448 -22381 0

c  2+1 --> break 
c    (-b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧  p_448) -> break
c  in CNF:
c     b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ -p_448 ∨ break
c  in DIMACS:
 22376 -22377  22378 -448 1162 0


c  2-1 --> 1
c    (-b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧ -p_448) -> (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0)
c  in CNF:
c     b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_2
c     b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_1
c     b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨  b^{224, 3}_0
c  in DIMACS:
 22376 -22377  22378  448 -22379 0
 22376 -22377  22378  448 -22380 0
 22376 -22377  22378  448  22381 0

c  1-1 --> 0
c    (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0 ∧ -p_448) -> (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧ -b^{224, 3}_0)
c  in CNF:
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_2
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_1
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_0
c  in DIMACS:
 22376  22377 -22378  448 -22379 0
 22376  22377 -22378  448 -22380 0
 22376  22377 -22378  448 -22381 0

c  0-1 --> -1
c    (-b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧ -p_448) -> ( b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0)
c  in CNF:
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨  b^{224, 3}_2
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_1
c     b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨  b^{224, 3}_0
c  in DIMACS:
 22376  22377  22378  448  22379 0
 22376  22377  22378  448 -22380 0
 22376  22377  22378  448  22381 0

c  -1-1 --> -2
c    ( b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧  b^{224, 2}_0 ∧ -p_448) -> ( b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0)
c  in CNF:
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨  b^{224, 3}_2
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨  b^{224, 3}_1
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨  p_448 ∨ -b^{224, 3}_0
c  in DIMACS:
-22376  22377 -22378  448  22379 0
-22376  22377 -22378  448  22380 0
-22376  22377 -22378  448 -22381 0

c  -2-1 --> break 
c    ( b^{224, 2}_2 ∧  b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧ -p_448) -> break
c  in CNF:
c    -b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨  b^{224, 2}_0 ∨  p_448 ∨ break
c  in DIMACS:
-22376 -22377  22378  448 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{224, 2}_2 ∧ -b^{224, 2}_1 ∧ -b^{224, 2}_0 ∧ true) 
c  in CNF:
c    -b^{224, 2}_2 ∨  b^{224, 2}_1 ∨  b^{224, 2}_0 ∨ false 
c  in DIMACS:
-22376  22377  22378  0

c  3 does not represent an automaton state.
c    -(-b^{224, 2}_2 ∧  b^{224, 2}_1 ∧  b^{224, 2}_0 ∧ true) 
c  in CNF:
c     b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ false 
c  in DIMACS:
 22376 -22377 -22378  0
c  -3 does not represent an automaton state.
c    -( b^{224, 2}_2 ∧  b^{224, 2}_1 ∧  b^{224, 2}_0 ∧ true) 
c  in CNF:
c    -b^{224, 2}_2 ∨ -b^{224, 2}_1 ∨ -b^{224, 2}_0 ∨ false 
c  in DIMACS:
-22376 -22377 -22378  0

c i = 3
c  -2+1 --> -1
c    ( b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧  p_672) -> ( b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0)
c  in CNF:
c    -b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨  b^{224, 4}_2
c    -b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_1
c    -b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨  b^{224, 4}_0
c  in DIMACS:
-22379 -22380  22381 -672  22382 0
-22379 -22380  22381 -672 -22383 0
-22379 -22380  22381 -672  22384 0

c  -1+1 --> 0
c    ( b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0 ∧  p_672) -> (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧ -b^{224, 4}_0)
c  in CNF:
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_2
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_1
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_0
c  in DIMACS:
-22379  22380 -22381 -672 -22382 0
-22379  22380 -22381 -672 -22383 0
-22379  22380 -22381 -672 -22384 0

c  0+1 --> 1
c    (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧  p_672) -> (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0)
c  in CNF:
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_2
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_1
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨  b^{224, 4}_0
c  in DIMACS:
 22379  22380  22381 -672 -22382 0
 22379  22380  22381 -672 -22383 0
 22379  22380  22381 -672  22384 0

c  1+1 --> 2
c    (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0 ∧  p_672) -> (-b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0)
c  in CNF:
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_2
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨  b^{224, 4}_1
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ -p_672 ∨ -b^{224, 4}_0
c  in DIMACS:
 22379  22380 -22381 -672 -22382 0
 22379  22380 -22381 -672  22383 0
 22379  22380 -22381 -672 -22384 0

c  2+1 --> break 
c    (-b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧  p_672) -> break
c  in CNF:
c     b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 22379 -22380  22381 -672 1162 0


c  2-1 --> 1
c    (-b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧ -p_672) -> (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0)
c  in CNF:
c     b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_2
c     b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_1
c     b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨  b^{224, 4}_0
c  in DIMACS:
 22379 -22380  22381  672 -22382 0
 22379 -22380  22381  672 -22383 0
 22379 -22380  22381  672  22384 0

c  1-1 --> 0
c    (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0 ∧ -p_672) -> (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧ -b^{224, 4}_0)
c  in CNF:
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_2
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_1
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_0
c  in DIMACS:
 22379  22380 -22381  672 -22382 0
 22379  22380 -22381  672 -22383 0
 22379  22380 -22381  672 -22384 0

c  0-1 --> -1
c    (-b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧ -p_672) -> ( b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0)
c  in CNF:
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨  b^{224, 4}_2
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_1
c     b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨  b^{224, 4}_0
c  in DIMACS:
 22379  22380  22381  672  22382 0
 22379  22380  22381  672 -22383 0
 22379  22380  22381  672  22384 0

c  -1-1 --> -2
c    ( b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧  b^{224, 3}_0 ∧ -p_672) -> ( b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0)
c  in CNF:
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨  b^{224, 4}_2
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨  b^{224, 4}_1
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨  p_672 ∨ -b^{224, 4}_0
c  in DIMACS:
-22379  22380 -22381  672  22382 0
-22379  22380 -22381  672  22383 0
-22379  22380 -22381  672 -22384 0

c  -2-1 --> break 
c    ( b^{224, 3}_2 ∧  b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨  b^{224, 3}_0 ∨  p_672 ∨ break
c  in DIMACS:
-22379 -22380  22381  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{224, 3}_2 ∧ -b^{224, 3}_1 ∧ -b^{224, 3}_0 ∧ true) 
c  in CNF:
c    -b^{224, 3}_2 ∨  b^{224, 3}_1 ∨  b^{224, 3}_0 ∨ false 
c  in DIMACS:
-22379  22380  22381  0

c  3 does not represent an automaton state.
c    -(-b^{224, 3}_2 ∧  b^{224, 3}_1 ∧  b^{224, 3}_0 ∧ true) 
c  in CNF:
c     b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ false 
c  in DIMACS:
 22379 -22380 -22381  0
c  -3 does not represent an automaton state.
c    -( b^{224, 3}_2 ∧  b^{224, 3}_1 ∧  b^{224, 3}_0 ∧ true) 
c  in CNF:
c    -b^{224, 3}_2 ∨ -b^{224, 3}_1 ∨ -b^{224, 3}_0 ∨ false 
c  in DIMACS:
-22379 -22380 -22381  0

c i = 4
c  -2+1 --> -1
c    ( b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧  p_896) -> ( b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0)
c  in CNF:
c    -b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨  b^{224, 5}_2
c    -b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_1
c    -b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨  b^{224, 5}_0
c  in DIMACS:
-22382 -22383  22384 -896  22385 0
-22382 -22383  22384 -896 -22386 0
-22382 -22383  22384 -896  22387 0

c  -1+1 --> 0
c    ( b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0 ∧  p_896) -> (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧ -b^{224, 5}_0)
c  in CNF:
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_2
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_1
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_0
c  in DIMACS:
-22382  22383 -22384 -896 -22385 0
-22382  22383 -22384 -896 -22386 0
-22382  22383 -22384 -896 -22387 0

c  0+1 --> 1
c    (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧  p_896) -> (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0)
c  in CNF:
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_2
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_1
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨  b^{224, 5}_0
c  in DIMACS:
 22382  22383  22384 -896 -22385 0
 22382  22383  22384 -896 -22386 0
 22382  22383  22384 -896  22387 0

c  1+1 --> 2
c    (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0 ∧  p_896) -> (-b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0)
c  in CNF:
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_2
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨  b^{224, 5}_1
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ -p_896 ∨ -b^{224, 5}_0
c  in DIMACS:
 22382  22383 -22384 -896 -22385 0
 22382  22383 -22384 -896  22386 0
 22382  22383 -22384 -896 -22387 0

c  2+1 --> break 
c    (-b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧  p_896) -> break
c  in CNF:
c     b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ -p_896 ∨ break
c  in DIMACS:
 22382 -22383  22384 -896 1162 0


c  2-1 --> 1
c    (-b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧ -p_896) -> (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0)
c  in CNF:
c     b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_2
c     b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_1
c     b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨  b^{224, 5}_0
c  in DIMACS:
 22382 -22383  22384  896 -22385 0
 22382 -22383  22384  896 -22386 0
 22382 -22383  22384  896  22387 0

c  1-1 --> 0
c    (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0 ∧ -p_896) -> (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧ -b^{224, 5}_0)
c  in CNF:
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_2
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_1
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_0
c  in DIMACS:
 22382  22383 -22384  896 -22385 0
 22382  22383 -22384  896 -22386 0
 22382  22383 -22384  896 -22387 0

c  0-1 --> -1
c    (-b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧ -p_896) -> ( b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0)
c  in CNF:
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨  b^{224, 5}_2
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_1
c     b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨  b^{224, 5}_0
c  in DIMACS:
 22382  22383  22384  896  22385 0
 22382  22383  22384  896 -22386 0
 22382  22383  22384  896  22387 0

c  -1-1 --> -2
c    ( b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧  b^{224, 4}_0 ∧ -p_896) -> ( b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0)
c  in CNF:
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨  b^{224, 5}_2
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨  b^{224, 5}_1
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨  p_896 ∨ -b^{224, 5}_0
c  in DIMACS:
-22382  22383 -22384  896  22385 0
-22382  22383 -22384  896  22386 0
-22382  22383 -22384  896 -22387 0

c  -2-1 --> break 
c    ( b^{224, 4}_2 ∧  b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧ -p_896) -> break
c  in CNF:
c    -b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨  b^{224, 4}_0 ∨  p_896 ∨ break
c  in DIMACS:
-22382 -22383  22384  896 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{224, 4}_2 ∧ -b^{224, 4}_1 ∧ -b^{224, 4}_0 ∧ true) 
c  in CNF:
c    -b^{224, 4}_2 ∨  b^{224, 4}_1 ∨  b^{224, 4}_0 ∨ false 
c  in DIMACS:
-22382  22383  22384  0

c  3 does not represent an automaton state.
c    -(-b^{224, 4}_2 ∧  b^{224, 4}_1 ∧  b^{224, 4}_0 ∧ true) 
c  in CNF:
c     b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ false 
c  in DIMACS:
 22382 -22383 -22384  0
c  -3 does not represent an automaton state.
c    -( b^{224, 4}_2 ∧  b^{224, 4}_1 ∧  b^{224, 4}_0 ∧ true) 
c  in CNF:
c    -b^{224, 4}_2 ∨ -b^{224, 4}_1 ∨ -b^{224, 4}_0 ∨ false 
c  in DIMACS:
-22382 -22383 -22384  0

c i = 5
c  -2+1 --> -1
c    ( b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧  p_1120) -> ( b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧  b^{224, 6}_0)
c  in CNF:
c    -b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨  b^{224, 6}_2
c    -b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_1
c    -b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨  b^{224, 6}_0
c  in DIMACS:
-22385 -22386  22387 -1120  22388 0
-22385 -22386  22387 -1120 -22389 0
-22385 -22386  22387 -1120  22390 0

c  -1+1 --> 0
c    ( b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0 ∧  p_1120) -> (-b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧ -b^{224, 6}_0)
c  in CNF:
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_2
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_1
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_0
c  in DIMACS:
-22385  22386 -22387 -1120 -22388 0
-22385  22386 -22387 -1120 -22389 0
-22385  22386 -22387 -1120 -22390 0

c  0+1 --> 1
c    (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧  p_1120) -> (-b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧  b^{224, 6}_0)
c  in CNF:
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_2
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_1
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨  b^{224, 6}_0
c  in DIMACS:
 22385  22386  22387 -1120 -22388 0
 22385  22386  22387 -1120 -22389 0
 22385  22386  22387 -1120  22390 0

c  1+1 --> 2
c    (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0 ∧  p_1120) -> (-b^{224, 6}_2 ∧  b^{224, 6}_1 ∧ -b^{224, 6}_0)
c  in CNF:
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_2
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨  b^{224, 6}_1
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ -p_1120 ∨ -b^{224, 6}_0
c  in DIMACS:
 22385  22386 -22387 -1120 -22388 0
 22385  22386 -22387 -1120  22389 0
 22385  22386 -22387 -1120 -22390 0

c  2+1 --> break 
c    (-b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 22385 -22386  22387 -1120 1162 0


c  2-1 --> 1
c    (-b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧ -p_1120) -> (-b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧  b^{224, 6}_0)
c  in CNF:
c     b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_2
c     b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_1
c     b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨  b^{224, 6}_0
c  in DIMACS:
 22385 -22386  22387  1120 -22388 0
 22385 -22386  22387  1120 -22389 0
 22385 -22386  22387  1120  22390 0

c  1-1 --> 0
c    (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0 ∧ -p_1120) -> (-b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧ -b^{224, 6}_0)
c  in CNF:
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_2
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_1
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_0
c  in DIMACS:
 22385  22386 -22387  1120 -22388 0
 22385  22386 -22387  1120 -22389 0
 22385  22386 -22387  1120 -22390 0

c  0-1 --> -1
c    (-b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧ -p_1120) -> ( b^{224, 6}_2 ∧ -b^{224, 6}_1 ∧  b^{224, 6}_0)
c  in CNF:
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨  b^{224, 6}_2
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_1
c     b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨  b^{224, 6}_0
c  in DIMACS:
 22385  22386  22387  1120  22388 0
 22385  22386  22387  1120 -22389 0
 22385  22386  22387  1120  22390 0

c  -1-1 --> -2
c    ( b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧  b^{224, 5}_0 ∧ -p_1120) -> ( b^{224, 6}_2 ∧  b^{224, 6}_1 ∧ -b^{224, 6}_0)
c  in CNF:
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨  b^{224, 6}_2
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨  b^{224, 6}_1
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨  p_1120 ∨ -b^{224, 6}_0
c  in DIMACS:
-22385  22386 -22387  1120  22388 0
-22385  22386 -22387  1120  22389 0
-22385  22386 -22387  1120 -22390 0

c  -2-1 --> break 
c    ( b^{224, 5}_2 ∧  b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨  b^{224, 5}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-22385 -22386  22387  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{224, 5}_2 ∧ -b^{224, 5}_1 ∧ -b^{224, 5}_0 ∧ true) 
c  in CNF:
c    -b^{224, 5}_2 ∨  b^{224, 5}_1 ∨  b^{224, 5}_0 ∨ false 
c  in DIMACS:
-22385  22386  22387  0

c  3 does not represent an automaton state.
c    -(-b^{224, 5}_2 ∧  b^{224, 5}_1 ∧  b^{224, 5}_0 ∧ true) 
c  in CNF:
c     b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ false 
c  in DIMACS:
 22385 -22386 -22387  0
c  -3 does not represent an automaton state.
c    -( b^{224, 5}_2 ∧  b^{224, 5}_1 ∧  b^{224, 5}_0 ∧ true) 
c  in CNF:
c    -b^{224, 5}_2 ∨ -b^{224, 5}_1 ∨ -b^{224, 5}_0 ∨ false 
c  in DIMACS:
-22385 -22386 -22387  0

c INIT for k = 225
c    -b^{225, 1}_2
c    -b^{225, 1}_1
c    -b^{225, 1}_0
c  in DIMACS:
-22391 0
-22392 0
-22393 0

c Transitions for k = 225
c i = 1
c  -2+1 --> -1
c    ( b^{225, 1}_2 ∧  b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧  p_225) -> ( b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0)
c  in CNF:
c    -b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨  b^{225, 2}_2
c    -b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_1
c    -b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨  b^{225, 2}_0
c  in DIMACS:
-22391 -22392  22393 -225  22394 0
-22391 -22392  22393 -225 -22395 0
-22391 -22392  22393 -225  22396 0

c  -1+1 --> 0
c    ( b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧  b^{225, 1}_0 ∧  p_225) -> (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧ -b^{225, 2}_0)
c  in CNF:
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_2
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_1
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_0
c  in DIMACS:
-22391  22392 -22393 -225 -22394 0
-22391  22392 -22393 -225 -22395 0
-22391  22392 -22393 -225 -22396 0

c  0+1 --> 1
c    (-b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧  p_225) -> (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0)
c  in CNF:
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_2
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_1
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨  b^{225, 2}_0
c  in DIMACS:
 22391  22392  22393 -225 -22394 0
 22391  22392  22393 -225 -22395 0
 22391  22392  22393 -225  22396 0

c  1+1 --> 2
c    (-b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧  b^{225, 1}_0 ∧  p_225) -> (-b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0)
c  in CNF:
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_2
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨  b^{225, 2}_1
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ -p_225 ∨ -b^{225, 2}_0
c  in DIMACS:
 22391  22392 -22393 -225 -22394 0
 22391  22392 -22393 -225  22395 0
 22391  22392 -22393 -225 -22396 0

c  2+1 --> break 
c    (-b^{225, 1}_2 ∧  b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧  p_225) -> break
c  in CNF:
c     b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ -p_225 ∨ break
c  in DIMACS:
 22391 -22392  22393 -225 1162 0


c  2-1 --> 1
c    (-b^{225, 1}_2 ∧  b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧ -p_225) -> (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0)
c  in CNF:
c     b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_2
c     b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_1
c     b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨  b^{225, 2}_0
c  in DIMACS:
 22391 -22392  22393  225 -22394 0
 22391 -22392  22393  225 -22395 0
 22391 -22392  22393  225  22396 0

c  1-1 --> 0
c    (-b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧  b^{225, 1}_0 ∧ -p_225) -> (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧ -b^{225, 2}_0)
c  in CNF:
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_2
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_1
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_0
c  in DIMACS:
 22391  22392 -22393  225 -22394 0
 22391  22392 -22393  225 -22395 0
 22391  22392 -22393  225 -22396 0

c  0-1 --> -1
c    (-b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧ -p_225) -> ( b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0)
c  in CNF:
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨  b^{225, 2}_2
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_1
c     b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨  b^{225, 2}_0
c  in DIMACS:
 22391  22392  22393  225  22394 0
 22391  22392  22393  225 -22395 0
 22391  22392  22393  225  22396 0

c  -1-1 --> -2
c    ( b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧  b^{225, 1}_0 ∧ -p_225) -> ( b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0)
c  in CNF:
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨  b^{225, 2}_2
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨  b^{225, 2}_1
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨  p_225 ∨ -b^{225, 2}_0
c  in DIMACS:
-22391  22392 -22393  225  22394 0
-22391  22392 -22393  225  22395 0
-22391  22392 -22393  225 -22396 0

c  -2-1 --> break 
c    ( b^{225, 1}_2 ∧  b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧ -p_225) -> break
c  in CNF:
c    -b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨  b^{225, 1}_0 ∨  p_225 ∨ break
c  in DIMACS:
-22391 -22392  22393  225 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{225, 1}_2 ∧ -b^{225, 1}_1 ∧ -b^{225, 1}_0 ∧ true) 
c  in CNF:
c    -b^{225, 1}_2 ∨  b^{225, 1}_1 ∨  b^{225, 1}_0 ∨ false 
c  in DIMACS:
-22391  22392  22393  0

c  3 does not represent an automaton state.
c    -(-b^{225, 1}_2 ∧  b^{225, 1}_1 ∧  b^{225, 1}_0 ∧ true) 
c  in CNF:
c     b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ false 
c  in DIMACS:
 22391 -22392 -22393  0
c  -3 does not represent an automaton state.
c    -( b^{225, 1}_2 ∧  b^{225, 1}_1 ∧  b^{225, 1}_0 ∧ true) 
c  in CNF:
c    -b^{225, 1}_2 ∨ -b^{225, 1}_1 ∨ -b^{225, 1}_0 ∨ false 
c  in DIMACS:
-22391 -22392 -22393  0

c i = 2
c  -2+1 --> -1
c    ( b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧  p_450) -> ( b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0)
c  in CNF:
c    -b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨  b^{225, 3}_2
c    -b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_1
c    -b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨  b^{225, 3}_0
c  in DIMACS:
-22394 -22395  22396 -450  22397 0
-22394 -22395  22396 -450 -22398 0
-22394 -22395  22396 -450  22399 0

c  -1+1 --> 0
c    ( b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0 ∧  p_450) -> (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧ -b^{225, 3}_0)
c  in CNF:
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_2
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_1
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_0
c  in DIMACS:
-22394  22395 -22396 -450 -22397 0
-22394  22395 -22396 -450 -22398 0
-22394  22395 -22396 -450 -22399 0

c  0+1 --> 1
c    (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧  p_450) -> (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0)
c  in CNF:
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_2
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_1
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨  b^{225, 3}_0
c  in DIMACS:
 22394  22395  22396 -450 -22397 0
 22394  22395  22396 -450 -22398 0
 22394  22395  22396 -450  22399 0

c  1+1 --> 2
c    (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0 ∧  p_450) -> (-b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0)
c  in CNF:
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_2
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨  b^{225, 3}_1
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ -p_450 ∨ -b^{225, 3}_0
c  in DIMACS:
 22394  22395 -22396 -450 -22397 0
 22394  22395 -22396 -450  22398 0
 22394  22395 -22396 -450 -22399 0

c  2+1 --> break 
c    (-b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧  p_450) -> break
c  in CNF:
c     b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ -p_450 ∨ break
c  in DIMACS:
 22394 -22395  22396 -450 1162 0


c  2-1 --> 1
c    (-b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧ -p_450) -> (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0)
c  in CNF:
c     b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_2
c     b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_1
c     b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨  b^{225, 3}_0
c  in DIMACS:
 22394 -22395  22396  450 -22397 0
 22394 -22395  22396  450 -22398 0
 22394 -22395  22396  450  22399 0

c  1-1 --> 0
c    (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0 ∧ -p_450) -> (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧ -b^{225, 3}_0)
c  in CNF:
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_2
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_1
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_0
c  in DIMACS:
 22394  22395 -22396  450 -22397 0
 22394  22395 -22396  450 -22398 0
 22394  22395 -22396  450 -22399 0

c  0-1 --> -1
c    (-b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧ -p_450) -> ( b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0)
c  in CNF:
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨  b^{225, 3}_2
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_1
c     b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨  b^{225, 3}_0
c  in DIMACS:
 22394  22395  22396  450  22397 0
 22394  22395  22396  450 -22398 0
 22394  22395  22396  450  22399 0

c  -1-1 --> -2
c    ( b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧  b^{225, 2}_0 ∧ -p_450) -> ( b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0)
c  in CNF:
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨  b^{225, 3}_2
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨  b^{225, 3}_1
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨  p_450 ∨ -b^{225, 3}_0
c  in DIMACS:
-22394  22395 -22396  450  22397 0
-22394  22395 -22396  450  22398 0
-22394  22395 -22396  450 -22399 0

c  -2-1 --> break 
c    ( b^{225, 2}_2 ∧  b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧ -p_450) -> break
c  in CNF:
c    -b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨  b^{225, 2}_0 ∨  p_450 ∨ break
c  in DIMACS:
-22394 -22395  22396  450 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{225, 2}_2 ∧ -b^{225, 2}_1 ∧ -b^{225, 2}_0 ∧ true) 
c  in CNF:
c    -b^{225, 2}_2 ∨  b^{225, 2}_1 ∨  b^{225, 2}_0 ∨ false 
c  in DIMACS:
-22394  22395  22396  0

c  3 does not represent an automaton state.
c    -(-b^{225, 2}_2 ∧  b^{225, 2}_1 ∧  b^{225, 2}_0 ∧ true) 
c  in CNF:
c     b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ false 
c  in DIMACS:
 22394 -22395 -22396  0
c  -3 does not represent an automaton state.
c    -( b^{225, 2}_2 ∧  b^{225, 2}_1 ∧  b^{225, 2}_0 ∧ true) 
c  in CNF:
c    -b^{225, 2}_2 ∨ -b^{225, 2}_1 ∨ -b^{225, 2}_0 ∨ false 
c  in DIMACS:
-22394 -22395 -22396  0

c i = 3
c  -2+1 --> -1
c    ( b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧  p_675) -> ( b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0)
c  in CNF:
c    -b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨  b^{225, 4}_2
c    -b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_1
c    -b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨  b^{225, 4}_0
c  in DIMACS:
-22397 -22398  22399 -675  22400 0
-22397 -22398  22399 -675 -22401 0
-22397 -22398  22399 -675  22402 0

c  -1+1 --> 0
c    ( b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0 ∧  p_675) -> (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧ -b^{225, 4}_0)
c  in CNF:
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_2
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_1
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_0
c  in DIMACS:
-22397  22398 -22399 -675 -22400 0
-22397  22398 -22399 -675 -22401 0
-22397  22398 -22399 -675 -22402 0

c  0+1 --> 1
c    (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧  p_675) -> (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0)
c  in CNF:
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_2
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_1
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨  b^{225, 4}_0
c  in DIMACS:
 22397  22398  22399 -675 -22400 0
 22397  22398  22399 -675 -22401 0
 22397  22398  22399 -675  22402 0

c  1+1 --> 2
c    (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0 ∧  p_675) -> (-b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0)
c  in CNF:
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_2
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨  b^{225, 4}_1
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ -p_675 ∨ -b^{225, 4}_0
c  in DIMACS:
 22397  22398 -22399 -675 -22400 0
 22397  22398 -22399 -675  22401 0
 22397  22398 -22399 -675 -22402 0

c  2+1 --> break 
c    (-b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧  p_675) -> break
c  in CNF:
c     b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ -p_675 ∨ break
c  in DIMACS:
 22397 -22398  22399 -675 1162 0


c  2-1 --> 1
c    (-b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧ -p_675) -> (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0)
c  in CNF:
c     b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_2
c     b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_1
c     b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨  b^{225, 4}_0
c  in DIMACS:
 22397 -22398  22399  675 -22400 0
 22397 -22398  22399  675 -22401 0
 22397 -22398  22399  675  22402 0

c  1-1 --> 0
c    (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0 ∧ -p_675) -> (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧ -b^{225, 4}_0)
c  in CNF:
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_2
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_1
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_0
c  in DIMACS:
 22397  22398 -22399  675 -22400 0
 22397  22398 -22399  675 -22401 0
 22397  22398 -22399  675 -22402 0

c  0-1 --> -1
c    (-b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧ -p_675) -> ( b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0)
c  in CNF:
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨  b^{225, 4}_2
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_1
c     b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨  b^{225, 4}_0
c  in DIMACS:
 22397  22398  22399  675  22400 0
 22397  22398  22399  675 -22401 0
 22397  22398  22399  675  22402 0

c  -1-1 --> -2
c    ( b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧  b^{225, 3}_0 ∧ -p_675) -> ( b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0)
c  in CNF:
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨  b^{225, 4}_2
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨  b^{225, 4}_1
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨  p_675 ∨ -b^{225, 4}_0
c  in DIMACS:
-22397  22398 -22399  675  22400 0
-22397  22398 -22399  675  22401 0
-22397  22398 -22399  675 -22402 0

c  -2-1 --> break 
c    ( b^{225, 3}_2 ∧  b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧ -p_675) -> break
c  in CNF:
c    -b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨  b^{225, 3}_0 ∨  p_675 ∨ break
c  in DIMACS:
-22397 -22398  22399  675 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{225, 3}_2 ∧ -b^{225, 3}_1 ∧ -b^{225, 3}_0 ∧ true) 
c  in CNF:
c    -b^{225, 3}_2 ∨  b^{225, 3}_1 ∨  b^{225, 3}_0 ∨ false 
c  in DIMACS:
-22397  22398  22399  0

c  3 does not represent an automaton state.
c    -(-b^{225, 3}_2 ∧  b^{225, 3}_1 ∧  b^{225, 3}_0 ∧ true) 
c  in CNF:
c     b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ false 
c  in DIMACS:
 22397 -22398 -22399  0
c  -3 does not represent an automaton state.
c    -( b^{225, 3}_2 ∧  b^{225, 3}_1 ∧  b^{225, 3}_0 ∧ true) 
c  in CNF:
c    -b^{225, 3}_2 ∨ -b^{225, 3}_1 ∨ -b^{225, 3}_0 ∨ false 
c  in DIMACS:
-22397 -22398 -22399  0

c i = 4
c  -2+1 --> -1
c    ( b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧  p_900) -> ( b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0)
c  in CNF:
c    -b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨  b^{225, 5}_2
c    -b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_1
c    -b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨  b^{225, 5}_0
c  in DIMACS:
-22400 -22401  22402 -900  22403 0
-22400 -22401  22402 -900 -22404 0
-22400 -22401  22402 -900  22405 0

c  -1+1 --> 0
c    ( b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0 ∧  p_900) -> (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧ -b^{225, 5}_0)
c  in CNF:
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_2
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_1
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_0
c  in DIMACS:
-22400  22401 -22402 -900 -22403 0
-22400  22401 -22402 -900 -22404 0
-22400  22401 -22402 -900 -22405 0

c  0+1 --> 1
c    (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧  p_900) -> (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0)
c  in CNF:
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_2
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_1
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨  b^{225, 5}_0
c  in DIMACS:
 22400  22401  22402 -900 -22403 0
 22400  22401  22402 -900 -22404 0
 22400  22401  22402 -900  22405 0

c  1+1 --> 2
c    (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0 ∧  p_900) -> (-b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0)
c  in CNF:
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_2
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨  b^{225, 5}_1
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ -p_900 ∨ -b^{225, 5}_0
c  in DIMACS:
 22400  22401 -22402 -900 -22403 0
 22400  22401 -22402 -900  22404 0
 22400  22401 -22402 -900 -22405 0

c  2+1 --> break 
c    (-b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧  p_900) -> break
c  in CNF:
c     b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 22400 -22401  22402 -900 1162 0


c  2-1 --> 1
c    (-b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧ -p_900) -> (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0)
c  in CNF:
c     b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_2
c     b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_1
c     b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨  b^{225, 5}_0
c  in DIMACS:
 22400 -22401  22402  900 -22403 0
 22400 -22401  22402  900 -22404 0
 22400 -22401  22402  900  22405 0

c  1-1 --> 0
c    (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0 ∧ -p_900) -> (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧ -b^{225, 5}_0)
c  in CNF:
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_2
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_1
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_0
c  in DIMACS:
 22400  22401 -22402  900 -22403 0
 22400  22401 -22402  900 -22404 0
 22400  22401 -22402  900 -22405 0

c  0-1 --> -1
c    (-b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧ -p_900) -> ( b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0)
c  in CNF:
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨  b^{225, 5}_2
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_1
c     b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨  b^{225, 5}_0
c  in DIMACS:
 22400  22401  22402  900  22403 0
 22400  22401  22402  900 -22404 0
 22400  22401  22402  900  22405 0

c  -1-1 --> -2
c    ( b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧  b^{225, 4}_0 ∧ -p_900) -> ( b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0)
c  in CNF:
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨  b^{225, 5}_2
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨  b^{225, 5}_1
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨  p_900 ∨ -b^{225, 5}_0
c  in DIMACS:
-22400  22401 -22402  900  22403 0
-22400  22401 -22402  900  22404 0
-22400  22401 -22402  900 -22405 0

c  -2-1 --> break 
c    ( b^{225, 4}_2 ∧  b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨  b^{225, 4}_0 ∨  p_900 ∨ break
c  in DIMACS:
-22400 -22401  22402  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{225, 4}_2 ∧ -b^{225, 4}_1 ∧ -b^{225, 4}_0 ∧ true) 
c  in CNF:
c    -b^{225, 4}_2 ∨  b^{225, 4}_1 ∨  b^{225, 4}_0 ∨ false 
c  in DIMACS:
-22400  22401  22402  0

c  3 does not represent an automaton state.
c    -(-b^{225, 4}_2 ∧  b^{225, 4}_1 ∧  b^{225, 4}_0 ∧ true) 
c  in CNF:
c     b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ false 
c  in DIMACS:
 22400 -22401 -22402  0
c  -3 does not represent an automaton state.
c    -( b^{225, 4}_2 ∧  b^{225, 4}_1 ∧  b^{225, 4}_0 ∧ true) 
c  in CNF:
c    -b^{225, 4}_2 ∨ -b^{225, 4}_1 ∨ -b^{225, 4}_0 ∨ false 
c  in DIMACS:
-22400 -22401 -22402  0

c i = 5
c  -2+1 --> -1
c    ( b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧  p_1125) -> ( b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧  b^{225, 6}_0)
c  in CNF:
c    -b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨  b^{225, 6}_2
c    -b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_1
c    -b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨  b^{225, 6}_0
c  in DIMACS:
-22403 -22404  22405 -1125  22406 0
-22403 -22404  22405 -1125 -22407 0
-22403 -22404  22405 -1125  22408 0

c  -1+1 --> 0
c    ( b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0 ∧  p_1125) -> (-b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧ -b^{225, 6}_0)
c  in CNF:
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_2
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_1
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_0
c  in DIMACS:
-22403  22404 -22405 -1125 -22406 0
-22403  22404 -22405 -1125 -22407 0
-22403  22404 -22405 -1125 -22408 0

c  0+1 --> 1
c    (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧  p_1125) -> (-b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧  b^{225, 6}_0)
c  in CNF:
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_2
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_1
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨  b^{225, 6}_0
c  in DIMACS:
 22403  22404  22405 -1125 -22406 0
 22403  22404  22405 -1125 -22407 0
 22403  22404  22405 -1125  22408 0

c  1+1 --> 2
c    (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0 ∧  p_1125) -> (-b^{225, 6}_2 ∧  b^{225, 6}_1 ∧ -b^{225, 6}_0)
c  in CNF:
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_2
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨  b^{225, 6}_1
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ -p_1125 ∨ -b^{225, 6}_0
c  in DIMACS:
 22403  22404 -22405 -1125 -22406 0
 22403  22404 -22405 -1125  22407 0
 22403  22404 -22405 -1125 -22408 0

c  2+1 --> break 
c    (-b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 22403 -22404  22405 -1125 1162 0


c  2-1 --> 1
c    (-b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧ -p_1125) -> (-b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧  b^{225, 6}_0)
c  in CNF:
c     b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_2
c     b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_1
c     b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨  b^{225, 6}_0
c  in DIMACS:
 22403 -22404  22405  1125 -22406 0
 22403 -22404  22405  1125 -22407 0
 22403 -22404  22405  1125  22408 0

c  1-1 --> 0
c    (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0 ∧ -p_1125) -> (-b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧ -b^{225, 6}_0)
c  in CNF:
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_2
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_1
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_0
c  in DIMACS:
 22403  22404 -22405  1125 -22406 0
 22403  22404 -22405  1125 -22407 0
 22403  22404 -22405  1125 -22408 0

c  0-1 --> -1
c    (-b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧ -p_1125) -> ( b^{225, 6}_2 ∧ -b^{225, 6}_1 ∧  b^{225, 6}_0)
c  in CNF:
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨  b^{225, 6}_2
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_1
c     b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨  b^{225, 6}_0
c  in DIMACS:
 22403  22404  22405  1125  22406 0
 22403  22404  22405  1125 -22407 0
 22403  22404  22405  1125  22408 0

c  -1-1 --> -2
c    ( b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧  b^{225, 5}_0 ∧ -p_1125) -> ( b^{225, 6}_2 ∧  b^{225, 6}_1 ∧ -b^{225, 6}_0)
c  in CNF:
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨  b^{225, 6}_2
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨  b^{225, 6}_1
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨  p_1125 ∨ -b^{225, 6}_0
c  in DIMACS:
-22403  22404 -22405  1125  22406 0
-22403  22404 -22405  1125  22407 0
-22403  22404 -22405  1125 -22408 0

c  -2-1 --> break 
c    ( b^{225, 5}_2 ∧  b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨  b^{225, 5}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-22403 -22404  22405  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{225, 5}_2 ∧ -b^{225, 5}_1 ∧ -b^{225, 5}_0 ∧ true) 
c  in CNF:
c    -b^{225, 5}_2 ∨  b^{225, 5}_1 ∨  b^{225, 5}_0 ∨ false 
c  in DIMACS:
-22403  22404  22405  0

c  3 does not represent an automaton state.
c    -(-b^{225, 5}_2 ∧  b^{225, 5}_1 ∧  b^{225, 5}_0 ∧ true) 
c  in CNF:
c     b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ false 
c  in DIMACS:
 22403 -22404 -22405  0
c  -3 does not represent an automaton state.
c    -( b^{225, 5}_2 ∧  b^{225, 5}_1 ∧  b^{225, 5}_0 ∧ true) 
c  in CNF:
c    -b^{225, 5}_2 ∨ -b^{225, 5}_1 ∨ -b^{225, 5}_0 ∨ false 
c  in DIMACS:
-22403 -22404 -22405  0

c INIT for k = 226
c    -b^{226, 1}_2
c    -b^{226, 1}_1
c    -b^{226, 1}_0
c  in DIMACS:
-22409 0
-22410 0
-22411 0

c Transitions for k = 226
c i = 1
c  -2+1 --> -1
c    ( b^{226, 1}_2 ∧  b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧  p_226) -> ( b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0)
c  in CNF:
c    -b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨  b^{226, 2}_2
c    -b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_1
c    -b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨  b^{226, 2}_0
c  in DIMACS:
-22409 -22410  22411 -226  22412 0
-22409 -22410  22411 -226 -22413 0
-22409 -22410  22411 -226  22414 0

c  -1+1 --> 0
c    ( b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧  b^{226, 1}_0 ∧  p_226) -> (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧ -b^{226, 2}_0)
c  in CNF:
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_2
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_1
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_0
c  in DIMACS:
-22409  22410 -22411 -226 -22412 0
-22409  22410 -22411 -226 -22413 0
-22409  22410 -22411 -226 -22414 0

c  0+1 --> 1
c    (-b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧  p_226) -> (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0)
c  in CNF:
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_2
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_1
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨  b^{226, 2}_0
c  in DIMACS:
 22409  22410  22411 -226 -22412 0
 22409  22410  22411 -226 -22413 0
 22409  22410  22411 -226  22414 0

c  1+1 --> 2
c    (-b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧  b^{226, 1}_0 ∧  p_226) -> (-b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0)
c  in CNF:
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_2
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨  b^{226, 2}_1
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ -p_226 ∨ -b^{226, 2}_0
c  in DIMACS:
 22409  22410 -22411 -226 -22412 0
 22409  22410 -22411 -226  22413 0
 22409  22410 -22411 -226 -22414 0

c  2+1 --> break 
c    (-b^{226, 1}_2 ∧  b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧  p_226) -> break
c  in CNF:
c     b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ -p_226 ∨ break
c  in DIMACS:
 22409 -22410  22411 -226 1162 0


c  2-1 --> 1
c    (-b^{226, 1}_2 ∧  b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧ -p_226) -> (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0)
c  in CNF:
c     b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_2
c     b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_1
c     b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨  b^{226, 2}_0
c  in DIMACS:
 22409 -22410  22411  226 -22412 0
 22409 -22410  22411  226 -22413 0
 22409 -22410  22411  226  22414 0

c  1-1 --> 0
c    (-b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧  b^{226, 1}_0 ∧ -p_226) -> (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧ -b^{226, 2}_0)
c  in CNF:
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_2
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_1
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_0
c  in DIMACS:
 22409  22410 -22411  226 -22412 0
 22409  22410 -22411  226 -22413 0
 22409  22410 -22411  226 -22414 0

c  0-1 --> -1
c    (-b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧ -p_226) -> ( b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0)
c  in CNF:
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨  b^{226, 2}_2
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_1
c     b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨  b^{226, 2}_0
c  in DIMACS:
 22409  22410  22411  226  22412 0
 22409  22410  22411  226 -22413 0
 22409  22410  22411  226  22414 0

c  -1-1 --> -2
c    ( b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧  b^{226, 1}_0 ∧ -p_226) -> ( b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0)
c  in CNF:
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨  b^{226, 2}_2
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨  b^{226, 2}_1
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨  p_226 ∨ -b^{226, 2}_0
c  in DIMACS:
-22409  22410 -22411  226  22412 0
-22409  22410 -22411  226  22413 0
-22409  22410 -22411  226 -22414 0

c  -2-1 --> break 
c    ( b^{226, 1}_2 ∧  b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧ -p_226) -> break
c  in CNF:
c    -b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨  b^{226, 1}_0 ∨  p_226 ∨ break
c  in DIMACS:
-22409 -22410  22411  226 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{226, 1}_2 ∧ -b^{226, 1}_1 ∧ -b^{226, 1}_0 ∧ true) 
c  in CNF:
c    -b^{226, 1}_2 ∨  b^{226, 1}_1 ∨  b^{226, 1}_0 ∨ false 
c  in DIMACS:
-22409  22410  22411  0

c  3 does not represent an automaton state.
c    -(-b^{226, 1}_2 ∧  b^{226, 1}_1 ∧  b^{226, 1}_0 ∧ true) 
c  in CNF:
c     b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ false 
c  in DIMACS:
 22409 -22410 -22411  0
c  -3 does not represent an automaton state.
c    -( b^{226, 1}_2 ∧  b^{226, 1}_1 ∧  b^{226, 1}_0 ∧ true) 
c  in CNF:
c    -b^{226, 1}_2 ∨ -b^{226, 1}_1 ∨ -b^{226, 1}_0 ∨ false 
c  in DIMACS:
-22409 -22410 -22411  0

c i = 2
c  -2+1 --> -1
c    ( b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧  p_452) -> ( b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0)
c  in CNF:
c    -b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨  b^{226, 3}_2
c    -b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_1
c    -b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨  b^{226, 3}_0
c  in DIMACS:
-22412 -22413  22414 -452  22415 0
-22412 -22413  22414 -452 -22416 0
-22412 -22413  22414 -452  22417 0

c  -1+1 --> 0
c    ( b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0 ∧  p_452) -> (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧ -b^{226, 3}_0)
c  in CNF:
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_2
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_1
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_0
c  in DIMACS:
-22412  22413 -22414 -452 -22415 0
-22412  22413 -22414 -452 -22416 0
-22412  22413 -22414 -452 -22417 0

c  0+1 --> 1
c    (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧  p_452) -> (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0)
c  in CNF:
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_2
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_1
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨  b^{226, 3}_0
c  in DIMACS:
 22412  22413  22414 -452 -22415 0
 22412  22413  22414 -452 -22416 0
 22412  22413  22414 -452  22417 0

c  1+1 --> 2
c    (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0 ∧  p_452) -> (-b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0)
c  in CNF:
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_2
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨  b^{226, 3}_1
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ -p_452 ∨ -b^{226, 3}_0
c  in DIMACS:
 22412  22413 -22414 -452 -22415 0
 22412  22413 -22414 -452  22416 0
 22412  22413 -22414 -452 -22417 0

c  2+1 --> break 
c    (-b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧  p_452) -> break
c  in CNF:
c     b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ -p_452 ∨ break
c  in DIMACS:
 22412 -22413  22414 -452 1162 0


c  2-1 --> 1
c    (-b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧ -p_452) -> (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0)
c  in CNF:
c     b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_2
c     b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_1
c     b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨  b^{226, 3}_0
c  in DIMACS:
 22412 -22413  22414  452 -22415 0
 22412 -22413  22414  452 -22416 0
 22412 -22413  22414  452  22417 0

c  1-1 --> 0
c    (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0 ∧ -p_452) -> (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧ -b^{226, 3}_0)
c  in CNF:
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_2
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_1
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_0
c  in DIMACS:
 22412  22413 -22414  452 -22415 0
 22412  22413 -22414  452 -22416 0
 22412  22413 -22414  452 -22417 0

c  0-1 --> -1
c    (-b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧ -p_452) -> ( b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0)
c  in CNF:
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨  b^{226, 3}_2
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_1
c     b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨  b^{226, 3}_0
c  in DIMACS:
 22412  22413  22414  452  22415 0
 22412  22413  22414  452 -22416 0
 22412  22413  22414  452  22417 0

c  -1-1 --> -2
c    ( b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧  b^{226, 2}_0 ∧ -p_452) -> ( b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0)
c  in CNF:
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨  b^{226, 3}_2
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨  b^{226, 3}_1
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨  p_452 ∨ -b^{226, 3}_0
c  in DIMACS:
-22412  22413 -22414  452  22415 0
-22412  22413 -22414  452  22416 0
-22412  22413 -22414  452 -22417 0

c  -2-1 --> break 
c    ( b^{226, 2}_2 ∧  b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧ -p_452) -> break
c  in CNF:
c    -b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨  b^{226, 2}_0 ∨  p_452 ∨ break
c  in DIMACS:
-22412 -22413  22414  452 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{226, 2}_2 ∧ -b^{226, 2}_1 ∧ -b^{226, 2}_0 ∧ true) 
c  in CNF:
c    -b^{226, 2}_2 ∨  b^{226, 2}_1 ∨  b^{226, 2}_0 ∨ false 
c  in DIMACS:
-22412  22413  22414  0

c  3 does not represent an automaton state.
c    -(-b^{226, 2}_2 ∧  b^{226, 2}_1 ∧  b^{226, 2}_0 ∧ true) 
c  in CNF:
c     b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ false 
c  in DIMACS:
 22412 -22413 -22414  0
c  -3 does not represent an automaton state.
c    -( b^{226, 2}_2 ∧  b^{226, 2}_1 ∧  b^{226, 2}_0 ∧ true) 
c  in CNF:
c    -b^{226, 2}_2 ∨ -b^{226, 2}_1 ∨ -b^{226, 2}_0 ∨ false 
c  in DIMACS:
-22412 -22413 -22414  0

c i = 3
c  -2+1 --> -1
c    ( b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧  p_678) -> ( b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0)
c  in CNF:
c    -b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨  b^{226, 4}_2
c    -b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_1
c    -b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨  b^{226, 4}_0
c  in DIMACS:
-22415 -22416  22417 -678  22418 0
-22415 -22416  22417 -678 -22419 0
-22415 -22416  22417 -678  22420 0

c  -1+1 --> 0
c    ( b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0 ∧  p_678) -> (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧ -b^{226, 4}_0)
c  in CNF:
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_2
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_1
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_0
c  in DIMACS:
-22415  22416 -22417 -678 -22418 0
-22415  22416 -22417 -678 -22419 0
-22415  22416 -22417 -678 -22420 0

c  0+1 --> 1
c    (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧  p_678) -> (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0)
c  in CNF:
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_2
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_1
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨  b^{226, 4}_0
c  in DIMACS:
 22415  22416  22417 -678 -22418 0
 22415  22416  22417 -678 -22419 0
 22415  22416  22417 -678  22420 0

c  1+1 --> 2
c    (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0 ∧  p_678) -> (-b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0)
c  in CNF:
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_2
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨  b^{226, 4}_1
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ -p_678 ∨ -b^{226, 4}_0
c  in DIMACS:
 22415  22416 -22417 -678 -22418 0
 22415  22416 -22417 -678  22419 0
 22415  22416 -22417 -678 -22420 0

c  2+1 --> break 
c    (-b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧  p_678) -> break
c  in CNF:
c     b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 22415 -22416  22417 -678 1162 0


c  2-1 --> 1
c    (-b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧ -p_678) -> (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0)
c  in CNF:
c     b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_2
c     b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_1
c     b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨  b^{226, 4}_0
c  in DIMACS:
 22415 -22416  22417  678 -22418 0
 22415 -22416  22417  678 -22419 0
 22415 -22416  22417  678  22420 0

c  1-1 --> 0
c    (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0 ∧ -p_678) -> (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧ -b^{226, 4}_0)
c  in CNF:
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_2
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_1
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_0
c  in DIMACS:
 22415  22416 -22417  678 -22418 0
 22415  22416 -22417  678 -22419 0
 22415  22416 -22417  678 -22420 0

c  0-1 --> -1
c    (-b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧ -p_678) -> ( b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0)
c  in CNF:
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨  b^{226, 4}_2
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_1
c     b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨  b^{226, 4}_0
c  in DIMACS:
 22415  22416  22417  678  22418 0
 22415  22416  22417  678 -22419 0
 22415  22416  22417  678  22420 0

c  -1-1 --> -2
c    ( b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧  b^{226, 3}_0 ∧ -p_678) -> ( b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0)
c  in CNF:
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨  b^{226, 4}_2
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨  b^{226, 4}_1
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨  p_678 ∨ -b^{226, 4}_0
c  in DIMACS:
-22415  22416 -22417  678  22418 0
-22415  22416 -22417  678  22419 0
-22415  22416 -22417  678 -22420 0

c  -2-1 --> break 
c    ( b^{226, 3}_2 ∧  b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨  b^{226, 3}_0 ∨  p_678 ∨ break
c  in DIMACS:
-22415 -22416  22417  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{226, 3}_2 ∧ -b^{226, 3}_1 ∧ -b^{226, 3}_0 ∧ true) 
c  in CNF:
c    -b^{226, 3}_2 ∨  b^{226, 3}_1 ∨  b^{226, 3}_0 ∨ false 
c  in DIMACS:
-22415  22416  22417  0

c  3 does not represent an automaton state.
c    -(-b^{226, 3}_2 ∧  b^{226, 3}_1 ∧  b^{226, 3}_0 ∧ true) 
c  in CNF:
c     b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ false 
c  in DIMACS:
 22415 -22416 -22417  0
c  -3 does not represent an automaton state.
c    -( b^{226, 3}_2 ∧  b^{226, 3}_1 ∧  b^{226, 3}_0 ∧ true) 
c  in CNF:
c    -b^{226, 3}_2 ∨ -b^{226, 3}_1 ∨ -b^{226, 3}_0 ∨ false 
c  in DIMACS:
-22415 -22416 -22417  0

c i = 4
c  -2+1 --> -1
c    ( b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧  p_904) -> ( b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0)
c  in CNF:
c    -b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨  b^{226, 5}_2
c    -b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_1
c    -b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨  b^{226, 5}_0
c  in DIMACS:
-22418 -22419  22420 -904  22421 0
-22418 -22419  22420 -904 -22422 0
-22418 -22419  22420 -904  22423 0

c  -1+1 --> 0
c    ( b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0 ∧  p_904) -> (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧ -b^{226, 5}_0)
c  in CNF:
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_2
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_1
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_0
c  in DIMACS:
-22418  22419 -22420 -904 -22421 0
-22418  22419 -22420 -904 -22422 0
-22418  22419 -22420 -904 -22423 0

c  0+1 --> 1
c    (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧  p_904) -> (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0)
c  in CNF:
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_2
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_1
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨  b^{226, 5}_0
c  in DIMACS:
 22418  22419  22420 -904 -22421 0
 22418  22419  22420 -904 -22422 0
 22418  22419  22420 -904  22423 0

c  1+1 --> 2
c    (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0 ∧  p_904) -> (-b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0)
c  in CNF:
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_2
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨  b^{226, 5}_1
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ -p_904 ∨ -b^{226, 5}_0
c  in DIMACS:
 22418  22419 -22420 -904 -22421 0
 22418  22419 -22420 -904  22422 0
 22418  22419 -22420 -904 -22423 0

c  2+1 --> break 
c    (-b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧  p_904) -> break
c  in CNF:
c     b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ -p_904 ∨ break
c  in DIMACS:
 22418 -22419  22420 -904 1162 0


c  2-1 --> 1
c    (-b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧ -p_904) -> (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0)
c  in CNF:
c     b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_2
c     b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_1
c     b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨  b^{226, 5}_0
c  in DIMACS:
 22418 -22419  22420  904 -22421 0
 22418 -22419  22420  904 -22422 0
 22418 -22419  22420  904  22423 0

c  1-1 --> 0
c    (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0 ∧ -p_904) -> (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧ -b^{226, 5}_0)
c  in CNF:
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_2
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_1
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_0
c  in DIMACS:
 22418  22419 -22420  904 -22421 0
 22418  22419 -22420  904 -22422 0
 22418  22419 -22420  904 -22423 0

c  0-1 --> -1
c    (-b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧ -p_904) -> ( b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0)
c  in CNF:
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨  b^{226, 5}_2
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_1
c     b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨  b^{226, 5}_0
c  in DIMACS:
 22418  22419  22420  904  22421 0
 22418  22419  22420  904 -22422 0
 22418  22419  22420  904  22423 0

c  -1-1 --> -2
c    ( b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧  b^{226, 4}_0 ∧ -p_904) -> ( b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0)
c  in CNF:
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨  b^{226, 5}_2
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨  b^{226, 5}_1
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨  p_904 ∨ -b^{226, 5}_0
c  in DIMACS:
-22418  22419 -22420  904  22421 0
-22418  22419 -22420  904  22422 0
-22418  22419 -22420  904 -22423 0

c  -2-1 --> break 
c    ( b^{226, 4}_2 ∧  b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧ -p_904) -> break
c  in CNF:
c    -b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨  b^{226, 4}_0 ∨  p_904 ∨ break
c  in DIMACS:
-22418 -22419  22420  904 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{226, 4}_2 ∧ -b^{226, 4}_1 ∧ -b^{226, 4}_0 ∧ true) 
c  in CNF:
c    -b^{226, 4}_2 ∨  b^{226, 4}_1 ∨  b^{226, 4}_0 ∨ false 
c  in DIMACS:
-22418  22419  22420  0

c  3 does not represent an automaton state.
c    -(-b^{226, 4}_2 ∧  b^{226, 4}_1 ∧  b^{226, 4}_0 ∧ true) 
c  in CNF:
c     b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ false 
c  in DIMACS:
 22418 -22419 -22420  0
c  -3 does not represent an automaton state.
c    -( b^{226, 4}_2 ∧  b^{226, 4}_1 ∧  b^{226, 4}_0 ∧ true) 
c  in CNF:
c    -b^{226, 4}_2 ∨ -b^{226, 4}_1 ∨ -b^{226, 4}_0 ∨ false 
c  in DIMACS:
-22418 -22419 -22420  0

c i = 5
c  -2+1 --> -1
c    ( b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧  p_1130) -> ( b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧  b^{226, 6}_0)
c  in CNF:
c    -b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨  b^{226, 6}_2
c    -b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_1
c    -b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨  b^{226, 6}_0
c  in DIMACS:
-22421 -22422  22423 -1130  22424 0
-22421 -22422  22423 -1130 -22425 0
-22421 -22422  22423 -1130  22426 0

c  -1+1 --> 0
c    ( b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0 ∧  p_1130) -> (-b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧ -b^{226, 6}_0)
c  in CNF:
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_2
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_1
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_0
c  in DIMACS:
-22421  22422 -22423 -1130 -22424 0
-22421  22422 -22423 -1130 -22425 0
-22421  22422 -22423 -1130 -22426 0

c  0+1 --> 1
c    (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧  p_1130) -> (-b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧  b^{226, 6}_0)
c  in CNF:
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_2
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_1
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨  b^{226, 6}_0
c  in DIMACS:
 22421  22422  22423 -1130 -22424 0
 22421  22422  22423 -1130 -22425 0
 22421  22422  22423 -1130  22426 0

c  1+1 --> 2
c    (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0 ∧  p_1130) -> (-b^{226, 6}_2 ∧  b^{226, 6}_1 ∧ -b^{226, 6}_0)
c  in CNF:
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_2
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨  b^{226, 6}_1
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ -p_1130 ∨ -b^{226, 6}_0
c  in DIMACS:
 22421  22422 -22423 -1130 -22424 0
 22421  22422 -22423 -1130  22425 0
 22421  22422 -22423 -1130 -22426 0

c  2+1 --> break 
c    (-b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧  p_1130) -> break
c  in CNF:
c     b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ -p_1130 ∨ break
c  in DIMACS:
 22421 -22422  22423 -1130 1162 0


c  2-1 --> 1
c    (-b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧ -p_1130) -> (-b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧  b^{226, 6}_0)
c  in CNF:
c     b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_2
c     b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_1
c     b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨  b^{226, 6}_0
c  in DIMACS:
 22421 -22422  22423  1130 -22424 0
 22421 -22422  22423  1130 -22425 0
 22421 -22422  22423  1130  22426 0

c  1-1 --> 0
c    (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0 ∧ -p_1130) -> (-b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧ -b^{226, 6}_0)
c  in CNF:
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_2
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_1
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_0
c  in DIMACS:
 22421  22422 -22423  1130 -22424 0
 22421  22422 -22423  1130 -22425 0
 22421  22422 -22423  1130 -22426 0

c  0-1 --> -1
c    (-b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧ -p_1130) -> ( b^{226, 6}_2 ∧ -b^{226, 6}_1 ∧  b^{226, 6}_0)
c  in CNF:
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨  b^{226, 6}_2
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_1
c     b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨  b^{226, 6}_0
c  in DIMACS:
 22421  22422  22423  1130  22424 0
 22421  22422  22423  1130 -22425 0
 22421  22422  22423  1130  22426 0

c  -1-1 --> -2
c    ( b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧  b^{226, 5}_0 ∧ -p_1130) -> ( b^{226, 6}_2 ∧  b^{226, 6}_1 ∧ -b^{226, 6}_0)
c  in CNF:
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨  b^{226, 6}_2
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨  b^{226, 6}_1
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨  p_1130 ∨ -b^{226, 6}_0
c  in DIMACS:
-22421  22422 -22423  1130  22424 0
-22421  22422 -22423  1130  22425 0
-22421  22422 -22423  1130 -22426 0

c  -2-1 --> break 
c    ( b^{226, 5}_2 ∧  b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧ -p_1130) -> break
c  in CNF:
c    -b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨  b^{226, 5}_0 ∨  p_1130 ∨ break
c  in DIMACS:
-22421 -22422  22423  1130 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{226, 5}_2 ∧ -b^{226, 5}_1 ∧ -b^{226, 5}_0 ∧ true) 
c  in CNF:
c    -b^{226, 5}_2 ∨  b^{226, 5}_1 ∨  b^{226, 5}_0 ∨ false 
c  in DIMACS:
-22421  22422  22423  0

c  3 does not represent an automaton state.
c    -(-b^{226, 5}_2 ∧  b^{226, 5}_1 ∧  b^{226, 5}_0 ∧ true) 
c  in CNF:
c     b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ false 
c  in DIMACS:
 22421 -22422 -22423  0
c  -3 does not represent an automaton state.
c    -( b^{226, 5}_2 ∧  b^{226, 5}_1 ∧  b^{226, 5}_0 ∧ true) 
c  in CNF:
c    -b^{226, 5}_2 ∨ -b^{226, 5}_1 ∨ -b^{226, 5}_0 ∨ false 
c  in DIMACS:
-22421 -22422 -22423  0

c INIT for k = 227
c    -b^{227, 1}_2
c    -b^{227, 1}_1
c    -b^{227, 1}_0
c  in DIMACS:
-22427 0
-22428 0
-22429 0

c Transitions for k = 227
c i = 1
c  -2+1 --> -1
c    ( b^{227, 1}_2 ∧  b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧  p_227) -> ( b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0)
c  in CNF:
c    -b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨  b^{227, 2}_2
c    -b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_1
c    -b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨  b^{227, 2}_0
c  in DIMACS:
-22427 -22428  22429 -227  22430 0
-22427 -22428  22429 -227 -22431 0
-22427 -22428  22429 -227  22432 0

c  -1+1 --> 0
c    ( b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧  b^{227, 1}_0 ∧  p_227) -> (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧ -b^{227, 2}_0)
c  in CNF:
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_2
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_1
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_0
c  in DIMACS:
-22427  22428 -22429 -227 -22430 0
-22427  22428 -22429 -227 -22431 0
-22427  22428 -22429 -227 -22432 0

c  0+1 --> 1
c    (-b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧  p_227) -> (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0)
c  in CNF:
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_2
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_1
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨  b^{227, 2}_0
c  in DIMACS:
 22427  22428  22429 -227 -22430 0
 22427  22428  22429 -227 -22431 0
 22427  22428  22429 -227  22432 0

c  1+1 --> 2
c    (-b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧  b^{227, 1}_0 ∧  p_227) -> (-b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0)
c  in CNF:
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_2
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨  b^{227, 2}_1
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ -p_227 ∨ -b^{227, 2}_0
c  in DIMACS:
 22427  22428 -22429 -227 -22430 0
 22427  22428 -22429 -227  22431 0
 22427  22428 -22429 -227 -22432 0

c  2+1 --> break 
c    (-b^{227, 1}_2 ∧  b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧  p_227) -> break
c  in CNF:
c     b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ -p_227 ∨ break
c  in DIMACS:
 22427 -22428  22429 -227 1162 0


c  2-1 --> 1
c    (-b^{227, 1}_2 ∧  b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧ -p_227) -> (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0)
c  in CNF:
c     b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_2
c     b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_1
c     b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨  b^{227, 2}_0
c  in DIMACS:
 22427 -22428  22429  227 -22430 0
 22427 -22428  22429  227 -22431 0
 22427 -22428  22429  227  22432 0

c  1-1 --> 0
c    (-b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧  b^{227, 1}_0 ∧ -p_227) -> (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧ -b^{227, 2}_0)
c  in CNF:
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_2
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_1
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_0
c  in DIMACS:
 22427  22428 -22429  227 -22430 0
 22427  22428 -22429  227 -22431 0
 22427  22428 -22429  227 -22432 0

c  0-1 --> -1
c    (-b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧ -p_227) -> ( b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0)
c  in CNF:
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨  b^{227, 2}_2
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_1
c     b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨  b^{227, 2}_0
c  in DIMACS:
 22427  22428  22429  227  22430 0
 22427  22428  22429  227 -22431 0
 22427  22428  22429  227  22432 0

c  -1-1 --> -2
c    ( b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧  b^{227, 1}_0 ∧ -p_227) -> ( b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0)
c  in CNF:
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨  b^{227, 2}_2
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨  b^{227, 2}_1
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨  p_227 ∨ -b^{227, 2}_0
c  in DIMACS:
-22427  22428 -22429  227  22430 0
-22427  22428 -22429  227  22431 0
-22427  22428 -22429  227 -22432 0

c  -2-1 --> break 
c    ( b^{227, 1}_2 ∧  b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧ -p_227) -> break
c  in CNF:
c    -b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨  b^{227, 1}_0 ∨  p_227 ∨ break
c  in DIMACS:
-22427 -22428  22429  227 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{227, 1}_2 ∧ -b^{227, 1}_1 ∧ -b^{227, 1}_0 ∧ true) 
c  in CNF:
c    -b^{227, 1}_2 ∨  b^{227, 1}_1 ∨  b^{227, 1}_0 ∨ false 
c  in DIMACS:
-22427  22428  22429  0

c  3 does not represent an automaton state.
c    -(-b^{227, 1}_2 ∧  b^{227, 1}_1 ∧  b^{227, 1}_0 ∧ true) 
c  in CNF:
c     b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ false 
c  in DIMACS:
 22427 -22428 -22429  0
c  -3 does not represent an automaton state.
c    -( b^{227, 1}_2 ∧  b^{227, 1}_1 ∧  b^{227, 1}_0 ∧ true) 
c  in CNF:
c    -b^{227, 1}_2 ∨ -b^{227, 1}_1 ∨ -b^{227, 1}_0 ∨ false 
c  in DIMACS:
-22427 -22428 -22429  0

c i = 2
c  -2+1 --> -1
c    ( b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧  p_454) -> ( b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0)
c  in CNF:
c    -b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨  b^{227, 3}_2
c    -b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_1
c    -b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨  b^{227, 3}_0
c  in DIMACS:
-22430 -22431  22432 -454  22433 0
-22430 -22431  22432 -454 -22434 0
-22430 -22431  22432 -454  22435 0

c  -1+1 --> 0
c    ( b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0 ∧  p_454) -> (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧ -b^{227, 3}_0)
c  in CNF:
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_2
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_1
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_0
c  in DIMACS:
-22430  22431 -22432 -454 -22433 0
-22430  22431 -22432 -454 -22434 0
-22430  22431 -22432 -454 -22435 0

c  0+1 --> 1
c    (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧  p_454) -> (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0)
c  in CNF:
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_2
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_1
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨  b^{227, 3}_0
c  in DIMACS:
 22430  22431  22432 -454 -22433 0
 22430  22431  22432 -454 -22434 0
 22430  22431  22432 -454  22435 0

c  1+1 --> 2
c    (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0 ∧  p_454) -> (-b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0)
c  in CNF:
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_2
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨  b^{227, 3}_1
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ -p_454 ∨ -b^{227, 3}_0
c  in DIMACS:
 22430  22431 -22432 -454 -22433 0
 22430  22431 -22432 -454  22434 0
 22430  22431 -22432 -454 -22435 0

c  2+1 --> break 
c    (-b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧  p_454) -> break
c  in CNF:
c     b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ -p_454 ∨ break
c  in DIMACS:
 22430 -22431  22432 -454 1162 0


c  2-1 --> 1
c    (-b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧ -p_454) -> (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0)
c  in CNF:
c     b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_2
c     b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_1
c     b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨  b^{227, 3}_0
c  in DIMACS:
 22430 -22431  22432  454 -22433 0
 22430 -22431  22432  454 -22434 0
 22430 -22431  22432  454  22435 0

c  1-1 --> 0
c    (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0 ∧ -p_454) -> (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧ -b^{227, 3}_0)
c  in CNF:
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_2
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_1
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_0
c  in DIMACS:
 22430  22431 -22432  454 -22433 0
 22430  22431 -22432  454 -22434 0
 22430  22431 -22432  454 -22435 0

c  0-1 --> -1
c    (-b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧ -p_454) -> ( b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0)
c  in CNF:
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨  b^{227, 3}_2
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_1
c     b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨  b^{227, 3}_0
c  in DIMACS:
 22430  22431  22432  454  22433 0
 22430  22431  22432  454 -22434 0
 22430  22431  22432  454  22435 0

c  -1-1 --> -2
c    ( b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧  b^{227, 2}_0 ∧ -p_454) -> ( b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0)
c  in CNF:
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨  b^{227, 3}_2
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨  b^{227, 3}_1
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨  p_454 ∨ -b^{227, 3}_0
c  in DIMACS:
-22430  22431 -22432  454  22433 0
-22430  22431 -22432  454  22434 0
-22430  22431 -22432  454 -22435 0

c  -2-1 --> break 
c    ( b^{227, 2}_2 ∧  b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧ -p_454) -> break
c  in CNF:
c    -b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨  b^{227, 2}_0 ∨  p_454 ∨ break
c  in DIMACS:
-22430 -22431  22432  454 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{227, 2}_2 ∧ -b^{227, 2}_1 ∧ -b^{227, 2}_0 ∧ true) 
c  in CNF:
c    -b^{227, 2}_2 ∨  b^{227, 2}_1 ∨  b^{227, 2}_0 ∨ false 
c  in DIMACS:
-22430  22431  22432  0

c  3 does not represent an automaton state.
c    -(-b^{227, 2}_2 ∧  b^{227, 2}_1 ∧  b^{227, 2}_0 ∧ true) 
c  in CNF:
c     b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ false 
c  in DIMACS:
 22430 -22431 -22432  0
c  -3 does not represent an automaton state.
c    -( b^{227, 2}_2 ∧  b^{227, 2}_1 ∧  b^{227, 2}_0 ∧ true) 
c  in CNF:
c    -b^{227, 2}_2 ∨ -b^{227, 2}_1 ∨ -b^{227, 2}_0 ∨ false 
c  in DIMACS:
-22430 -22431 -22432  0

c i = 3
c  -2+1 --> -1
c    ( b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧  p_681) -> ( b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0)
c  in CNF:
c    -b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨  b^{227, 4}_2
c    -b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_1
c    -b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨  b^{227, 4}_0
c  in DIMACS:
-22433 -22434  22435 -681  22436 0
-22433 -22434  22435 -681 -22437 0
-22433 -22434  22435 -681  22438 0

c  -1+1 --> 0
c    ( b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0 ∧  p_681) -> (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧ -b^{227, 4}_0)
c  in CNF:
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_2
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_1
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_0
c  in DIMACS:
-22433  22434 -22435 -681 -22436 0
-22433  22434 -22435 -681 -22437 0
-22433  22434 -22435 -681 -22438 0

c  0+1 --> 1
c    (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧  p_681) -> (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0)
c  in CNF:
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_2
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_1
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨  b^{227, 4}_0
c  in DIMACS:
 22433  22434  22435 -681 -22436 0
 22433  22434  22435 -681 -22437 0
 22433  22434  22435 -681  22438 0

c  1+1 --> 2
c    (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0 ∧  p_681) -> (-b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0)
c  in CNF:
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_2
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨  b^{227, 4}_1
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ -p_681 ∨ -b^{227, 4}_0
c  in DIMACS:
 22433  22434 -22435 -681 -22436 0
 22433  22434 -22435 -681  22437 0
 22433  22434 -22435 -681 -22438 0

c  2+1 --> break 
c    (-b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧  p_681) -> break
c  in CNF:
c     b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ -p_681 ∨ break
c  in DIMACS:
 22433 -22434  22435 -681 1162 0


c  2-1 --> 1
c    (-b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧ -p_681) -> (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0)
c  in CNF:
c     b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_2
c     b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_1
c     b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨  b^{227, 4}_0
c  in DIMACS:
 22433 -22434  22435  681 -22436 0
 22433 -22434  22435  681 -22437 0
 22433 -22434  22435  681  22438 0

c  1-1 --> 0
c    (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0 ∧ -p_681) -> (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧ -b^{227, 4}_0)
c  in CNF:
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_2
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_1
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_0
c  in DIMACS:
 22433  22434 -22435  681 -22436 0
 22433  22434 -22435  681 -22437 0
 22433  22434 -22435  681 -22438 0

c  0-1 --> -1
c    (-b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧ -p_681) -> ( b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0)
c  in CNF:
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨  b^{227, 4}_2
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_1
c     b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨  b^{227, 4}_0
c  in DIMACS:
 22433  22434  22435  681  22436 0
 22433  22434  22435  681 -22437 0
 22433  22434  22435  681  22438 0

c  -1-1 --> -2
c    ( b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧  b^{227, 3}_0 ∧ -p_681) -> ( b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0)
c  in CNF:
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨  b^{227, 4}_2
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨  b^{227, 4}_1
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨  p_681 ∨ -b^{227, 4}_0
c  in DIMACS:
-22433  22434 -22435  681  22436 0
-22433  22434 -22435  681  22437 0
-22433  22434 -22435  681 -22438 0

c  -2-1 --> break 
c    ( b^{227, 3}_2 ∧  b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧ -p_681) -> break
c  in CNF:
c    -b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨  b^{227, 3}_0 ∨  p_681 ∨ break
c  in DIMACS:
-22433 -22434  22435  681 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{227, 3}_2 ∧ -b^{227, 3}_1 ∧ -b^{227, 3}_0 ∧ true) 
c  in CNF:
c    -b^{227, 3}_2 ∨  b^{227, 3}_1 ∨  b^{227, 3}_0 ∨ false 
c  in DIMACS:
-22433  22434  22435  0

c  3 does not represent an automaton state.
c    -(-b^{227, 3}_2 ∧  b^{227, 3}_1 ∧  b^{227, 3}_0 ∧ true) 
c  in CNF:
c     b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ false 
c  in DIMACS:
 22433 -22434 -22435  0
c  -3 does not represent an automaton state.
c    -( b^{227, 3}_2 ∧  b^{227, 3}_1 ∧  b^{227, 3}_0 ∧ true) 
c  in CNF:
c    -b^{227, 3}_2 ∨ -b^{227, 3}_1 ∨ -b^{227, 3}_0 ∨ false 
c  in DIMACS:
-22433 -22434 -22435  0

c i = 4
c  -2+1 --> -1
c    ( b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧  p_908) -> ( b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0)
c  in CNF:
c    -b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨  b^{227, 5}_2
c    -b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_1
c    -b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨  b^{227, 5}_0
c  in DIMACS:
-22436 -22437  22438 -908  22439 0
-22436 -22437  22438 -908 -22440 0
-22436 -22437  22438 -908  22441 0

c  -1+1 --> 0
c    ( b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0 ∧  p_908) -> (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧ -b^{227, 5}_0)
c  in CNF:
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_2
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_1
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_0
c  in DIMACS:
-22436  22437 -22438 -908 -22439 0
-22436  22437 -22438 -908 -22440 0
-22436  22437 -22438 -908 -22441 0

c  0+1 --> 1
c    (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧  p_908) -> (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0)
c  in CNF:
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_2
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_1
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨  b^{227, 5}_0
c  in DIMACS:
 22436  22437  22438 -908 -22439 0
 22436  22437  22438 -908 -22440 0
 22436  22437  22438 -908  22441 0

c  1+1 --> 2
c    (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0 ∧  p_908) -> (-b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0)
c  in CNF:
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_2
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨  b^{227, 5}_1
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ -p_908 ∨ -b^{227, 5}_0
c  in DIMACS:
 22436  22437 -22438 -908 -22439 0
 22436  22437 -22438 -908  22440 0
 22436  22437 -22438 -908 -22441 0

c  2+1 --> break 
c    (-b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧  p_908) -> break
c  in CNF:
c     b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ -p_908 ∨ break
c  in DIMACS:
 22436 -22437  22438 -908 1162 0


c  2-1 --> 1
c    (-b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧ -p_908) -> (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0)
c  in CNF:
c     b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_2
c     b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_1
c     b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨  b^{227, 5}_0
c  in DIMACS:
 22436 -22437  22438  908 -22439 0
 22436 -22437  22438  908 -22440 0
 22436 -22437  22438  908  22441 0

c  1-1 --> 0
c    (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0 ∧ -p_908) -> (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧ -b^{227, 5}_0)
c  in CNF:
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_2
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_1
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_0
c  in DIMACS:
 22436  22437 -22438  908 -22439 0
 22436  22437 -22438  908 -22440 0
 22436  22437 -22438  908 -22441 0

c  0-1 --> -1
c    (-b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧ -p_908) -> ( b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0)
c  in CNF:
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨  b^{227, 5}_2
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_1
c     b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨  b^{227, 5}_0
c  in DIMACS:
 22436  22437  22438  908  22439 0
 22436  22437  22438  908 -22440 0
 22436  22437  22438  908  22441 0

c  -1-1 --> -2
c    ( b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧  b^{227, 4}_0 ∧ -p_908) -> ( b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0)
c  in CNF:
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨  b^{227, 5}_2
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨  b^{227, 5}_1
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨  p_908 ∨ -b^{227, 5}_0
c  in DIMACS:
-22436  22437 -22438  908  22439 0
-22436  22437 -22438  908  22440 0
-22436  22437 -22438  908 -22441 0

c  -2-1 --> break 
c    ( b^{227, 4}_2 ∧  b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧ -p_908) -> break
c  in CNF:
c    -b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨  b^{227, 4}_0 ∨  p_908 ∨ break
c  in DIMACS:
-22436 -22437  22438  908 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{227, 4}_2 ∧ -b^{227, 4}_1 ∧ -b^{227, 4}_0 ∧ true) 
c  in CNF:
c    -b^{227, 4}_2 ∨  b^{227, 4}_1 ∨  b^{227, 4}_0 ∨ false 
c  in DIMACS:
-22436  22437  22438  0

c  3 does not represent an automaton state.
c    -(-b^{227, 4}_2 ∧  b^{227, 4}_1 ∧  b^{227, 4}_0 ∧ true) 
c  in CNF:
c     b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ false 
c  in DIMACS:
 22436 -22437 -22438  0
c  -3 does not represent an automaton state.
c    -( b^{227, 4}_2 ∧  b^{227, 4}_1 ∧  b^{227, 4}_0 ∧ true) 
c  in CNF:
c    -b^{227, 4}_2 ∨ -b^{227, 4}_1 ∨ -b^{227, 4}_0 ∨ false 
c  in DIMACS:
-22436 -22437 -22438  0

c i = 5
c  -2+1 --> -1
c    ( b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧  p_1135) -> ( b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧  b^{227, 6}_0)
c  in CNF:
c    -b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨  b^{227, 6}_2
c    -b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_1
c    -b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨  b^{227, 6}_0
c  in DIMACS:
-22439 -22440  22441 -1135  22442 0
-22439 -22440  22441 -1135 -22443 0
-22439 -22440  22441 -1135  22444 0

c  -1+1 --> 0
c    ( b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0 ∧  p_1135) -> (-b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧ -b^{227, 6}_0)
c  in CNF:
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_2
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_1
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_0
c  in DIMACS:
-22439  22440 -22441 -1135 -22442 0
-22439  22440 -22441 -1135 -22443 0
-22439  22440 -22441 -1135 -22444 0

c  0+1 --> 1
c    (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧  p_1135) -> (-b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧  b^{227, 6}_0)
c  in CNF:
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_2
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_1
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨  b^{227, 6}_0
c  in DIMACS:
 22439  22440  22441 -1135 -22442 0
 22439  22440  22441 -1135 -22443 0
 22439  22440  22441 -1135  22444 0

c  1+1 --> 2
c    (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0 ∧  p_1135) -> (-b^{227, 6}_2 ∧  b^{227, 6}_1 ∧ -b^{227, 6}_0)
c  in CNF:
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_2
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨  b^{227, 6}_1
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ -p_1135 ∨ -b^{227, 6}_0
c  in DIMACS:
 22439  22440 -22441 -1135 -22442 0
 22439  22440 -22441 -1135  22443 0
 22439  22440 -22441 -1135 -22444 0

c  2+1 --> break 
c    (-b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧  p_1135) -> break
c  in CNF:
c     b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ -p_1135 ∨ break
c  in DIMACS:
 22439 -22440  22441 -1135 1162 0


c  2-1 --> 1
c    (-b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧ -p_1135) -> (-b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧  b^{227, 6}_0)
c  in CNF:
c     b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_2
c     b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_1
c     b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨  b^{227, 6}_0
c  in DIMACS:
 22439 -22440  22441  1135 -22442 0
 22439 -22440  22441  1135 -22443 0
 22439 -22440  22441  1135  22444 0

c  1-1 --> 0
c    (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0 ∧ -p_1135) -> (-b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧ -b^{227, 6}_0)
c  in CNF:
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_2
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_1
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_0
c  in DIMACS:
 22439  22440 -22441  1135 -22442 0
 22439  22440 -22441  1135 -22443 0
 22439  22440 -22441  1135 -22444 0

c  0-1 --> -1
c    (-b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧ -p_1135) -> ( b^{227, 6}_2 ∧ -b^{227, 6}_1 ∧  b^{227, 6}_0)
c  in CNF:
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨  b^{227, 6}_2
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_1
c     b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨  b^{227, 6}_0
c  in DIMACS:
 22439  22440  22441  1135  22442 0
 22439  22440  22441  1135 -22443 0
 22439  22440  22441  1135  22444 0

c  -1-1 --> -2
c    ( b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧  b^{227, 5}_0 ∧ -p_1135) -> ( b^{227, 6}_2 ∧  b^{227, 6}_1 ∧ -b^{227, 6}_0)
c  in CNF:
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨  b^{227, 6}_2
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨  b^{227, 6}_1
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨  p_1135 ∨ -b^{227, 6}_0
c  in DIMACS:
-22439  22440 -22441  1135  22442 0
-22439  22440 -22441  1135  22443 0
-22439  22440 -22441  1135 -22444 0

c  -2-1 --> break 
c    ( b^{227, 5}_2 ∧  b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧ -p_1135) -> break
c  in CNF:
c    -b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨  b^{227, 5}_0 ∨  p_1135 ∨ break
c  in DIMACS:
-22439 -22440  22441  1135 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{227, 5}_2 ∧ -b^{227, 5}_1 ∧ -b^{227, 5}_0 ∧ true) 
c  in CNF:
c    -b^{227, 5}_2 ∨  b^{227, 5}_1 ∨  b^{227, 5}_0 ∨ false 
c  in DIMACS:
-22439  22440  22441  0

c  3 does not represent an automaton state.
c    -(-b^{227, 5}_2 ∧  b^{227, 5}_1 ∧  b^{227, 5}_0 ∧ true) 
c  in CNF:
c     b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ false 
c  in DIMACS:
 22439 -22440 -22441  0
c  -3 does not represent an automaton state.
c    -( b^{227, 5}_2 ∧  b^{227, 5}_1 ∧  b^{227, 5}_0 ∧ true) 
c  in CNF:
c    -b^{227, 5}_2 ∨ -b^{227, 5}_1 ∨ -b^{227, 5}_0 ∨ false 
c  in DIMACS:
-22439 -22440 -22441  0

c INIT for k = 228
c    -b^{228, 1}_2
c    -b^{228, 1}_1
c    -b^{228, 1}_0
c  in DIMACS:
-22445 0
-22446 0
-22447 0

c Transitions for k = 228
c i = 1
c  -2+1 --> -1
c    ( b^{228, 1}_2 ∧  b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧  p_228) -> ( b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0)
c  in CNF:
c    -b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨  b^{228, 2}_2
c    -b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_1
c    -b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨  b^{228, 2}_0
c  in DIMACS:
-22445 -22446  22447 -228  22448 0
-22445 -22446  22447 -228 -22449 0
-22445 -22446  22447 -228  22450 0

c  -1+1 --> 0
c    ( b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧  b^{228, 1}_0 ∧  p_228) -> (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧ -b^{228, 2}_0)
c  in CNF:
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_2
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_1
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_0
c  in DIMACS:
-22445  22446 -22447 -228 -22448 0
-22445  22446 -22447 -228 -22449 0
-22445  22446 -22447 -228 -22450 0

c  0+1 --> 1
c    (-b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧  p_228) -> (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0)
c  in CNF:
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_2
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_1
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨  b^{228, 2}_0
c  in DIMACS:
 22445  22446  22447 -228 -22448 0
 22445  22446  22447 -228 -22449 0
 22445  22446  22447 -228  22450 0

c  1+1 --> 2
c    (-b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧  b^{228, 1}_0 ∧  p_228) -> (-b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0)
c  in CNF:
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_2
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨  b^{228, 2}_1
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ -p_228 ∨ -b^{228, 2}_0
c  in DIMACS:
 22445  22446 -22447 -228 -22448 0
 22445  22446 -22447 -228  22449 0
 22445  22446 -22447 -228 -22450 0

c  2+1 --> break 
c    (-b^{228, 1}_2 ∧  b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧  p_228) -> break
c  in CNF:
c     b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ -p_228 ∨ break
c  in DIMACS:
 22445 -22446  22447 -228 1162 0


c  2-1 --> 1
c    (-b^{228, 1}_2 ∧  b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧ -p_228) -> (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0)
c  in CNF:
c     b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_2
c     b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_1
c     b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨  b^{228, 2}_0
c  in DIMACS:
 22445 -22446  22447  228 -22448 0
 22445 -22446  22447  228 -22449 0
 22445 -22446  22447  228  22450 0

c  1-1 --> 0
c    (-b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧  b^{228, 1}_0 ∧ -p_228) -> (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧ -b^{228, 2}_0)
c  in CNF:
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_2
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_1
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_0
c  in DIMACS:
 22445  22446 -22447  228 -22448 0
 22445  22446 -22447  228 -22449 0
 22445  22446 -22447  228 -22450 0

c  0-1 --> -1
c    (-b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧ -p_228) -> ( b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0)
c  in CNF:
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨  b^{228, 2}_2
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_1
c     b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨  b^{228, 2}_0
c  in DIMACS:
 22445  22446  22447  228  22448 0
 22445  22446  22447  228 -22449 0
 22445  22446  22447  228  22450 0

c  -1-1 --> -2
c    ( b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧  b^{228, 1}_0 ∧ -p_228) -> ( b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0)
c  in CNF:
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨  b^{228, 2}_2
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨  b^{228, 2}_1
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨  p_228 ∨ -b^{228, 2}_0
c  in DIMACS:
-22445  22446 -22447  228  22448 0
-22445  22446 -22447  228  22449 0
-22445  22446 -22447  228 -22450 0

c  -2-1 --> break 
c    ( b^{228, 1}_2 ∧  b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧ -p_228) -> break
c  in CNF:
c    -b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨  b^{228, 1}_0 ∨  p_228 ∨ break
c  in DIMACS:
-22445 -22446  22447  228 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{228, 1}_2 ∧ -b^{228, 1}_1 ∧ -b^{228, 1}_0 ∧ true) 
c  in CNF:
c    -b^{228, 1}_2 ∨  b^{228, 1}_1 ∨  b^{228, 1}_0 ∨ false 
c  in DIMACS:
-22445  22446  22447  0

c  3 does not represent an automaton state.
c    -(-b^{228, 1}_2 ∧  b^{228, 1}_1 ∧  b^{228, 1}_0 ∧ true) 
c  in CNF:
c     b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ false 
c  in DIMACS:
 22445 -22446 -22447  0
c  -3 does not represent an automaton state.
c    -( b^{228, 1}_2 ∧  b^{228, 1}_1 ∧  b^{228, 1}_0 ∧ true) 
c  in CNF:
c    -b^{228, 1}_2 ∨ -b^{228, 1}_1 ∨ -b^{228, 1}_0 ∨ false 
c  in DIMACS:
-22445 -22446 -22447  0

c i = 2
c  -2+1 --> -1
c    ( b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧  p_456) -> ( b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0)
c  in CNF:
c    -b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨  b^{228, 3}_2
c    -b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_1
c    -b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨  b^{228, 3}_0
c  in DIMACS:
-22448 -22449  22450 -456  22451 0
-22448 -22449  22450 -456 -22452 0
-22448 -22449  22450 -456  22453 0

c  -1+1 --> 0
c    ( b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0 ∧  p_456) -> (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧ -b^{228, 3}_0)
c  in CNF:
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_2
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_1
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_0
c  in DIMACS:
-22448  22449 -22450 -456 -22451 0
-22448  22449 -22450 -456 -22452 0
-22448  22449 -22450 -456 -22453 0

c  0+1 --> 1
c    (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧  p_456) -> (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0)
c  in CNF:
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_2
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_1
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨  b^{228, 3}_0
c  in DIMACS:
 22448  22449  22450 -456 -22451 0
 22448  22449  22450 -456 -22452 0
 22448  22449  22450 -456  22453 0

c  1+1 --> 2
c    (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0 ∧  p_456) -> (-b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0)
c  in CNF:
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_2
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨  b^{228, 3}_1
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ -p_456 ∨ -b^{228, 3}_0
c  in DIMACS:
 22448  22449 -22450 -456 -22451 0
 22448  22449 -22450 -456  22452 0
 22448  22449 -22450 -456 -22453 0

c  2+1 --> break 
c    (-b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧  p_456) -> break
c  in CNF:
c     b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ -p_456 ∨ break
c  in DIMACS:
 22448 -22449  22450 -456 1162 0


c  2-1 --> 1
c    (-b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧ -p_456) -> (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0)
c  in CNF:
c     b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_2
c     b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_1
c     b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨  b^{228, 3}_0
c  in DIMACS:
 22448 -22449  22450  456 -22451 0
 22448 -22449  22450  456 -22452 0
 22448 -22449  22450  456  22453 0

c  1-1 --> 0
c    (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0 ∧ -p_456) -> (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧ -b^{228, 3}_0)
c  in CNF:
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_2
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_1
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_0
c  in DIMACS:
 22448  22449 -22450  456 -22451 0
 22448  22449 -22450  456 -22452 0
 22448  22449 -22450  456 -22453 0

c  0-1 --> -1
c    (-b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧ -p_456) -> ( b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0)
c  in CNF:
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨  b^{228, 3}_2
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_1
c     b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨  b^{228, 3}_0
c  in DIMACS:
 22448  22449  22450  456  22451 0
 22448  22449  22450  456 -22452 0
 22448  22449  22450  456  22453 0

c  -1-1 --> -2
c    ( b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧  b^{228, 2}_0 ∧ -p_456) -> ( b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0)
c  in CNF:
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨  b^{228, 3}_2
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨  b^{228, 3}_1
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨  p_456 ∨ -b^{228, 3}_0
c  in DIMACS:
-22448  22449 -22450  456  22451 0
-22448  22449 -22450  456  22452 0
-22448  22449 -22450  456 -22453 0

c  -2-1 --> break 
c    ( b^{228, 2}_2 ∧  b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧ -p_456) -> break
c  in CNF:
c    -b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨  b^{228, 2}_0 ∨  p_456 ∨ break
c  in DIMACS:
-22448 -22449  22450  456 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{228, 2}_2 ∧ -b^{228, 2}_1 ∧ -b^{228, 2}_0 ∧ true) 
c  in CNF:
c    -b^{228, 2}_2 ∨  b^{228, 2}_1 ∨  b^{228, 2}_0 ∨ false 
c  in DIMACS:
-22448  22449  22450  0

c  3 does not represent an automaton state.
c    -(-b^{228, 2}_2 ∧  b^{228, 2}_1 ∧  b^{228, 2}_0 ∧ true) 
c  in CNF:
c     b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ false 
c  in DIMACS:
 22448 -22449 -22450  0
c  -3 does not represent an automaton state.
c    -( b^{228, 2}_2 ∧  b^{228, 2}_1 ∧  b^{228, 2}_0 ∧ true) 
c  in CNF:
c    -b^{228, 2}_2 ∨ -b^{228, 2}_1 ∨ -b^{228, 2}_0 ∨ false 
c  in DIMACS:
-22448 -22449 -22450  0

c i = 3
c  -2+1 --> -1
c    ( b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧  p_684) -> ( b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0)
c  in CNF:
c    -b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨  b^{228, 4}_2
c    -b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_1
c    -b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨  b^{228, 4}_0
c  in DIMACS:
-22451 -22452  22453 -684  22454 0
-22451 -22452  22453 -684 -22455 0
-22451 -22452  22453 -684  22456 0

c  -1+1 --> 0
c    ( b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0 ∧  p_684) -> (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧ -b^{228, 4}_0)
c  in CNF:
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_2
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_1
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_0
c  in DIMACS:
-22451  22452 -22453 -684 -22454 0
-22451  22452 -22453 -684 -22455 0
-22451  22452 -22453 -684 -22456 0

c  0+1 --> 1
c    (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧  p_684) -> (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0)
c  in CNF:
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_2
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_1
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨  b^{228, 4}_0
c  in DIMACS:
 22451  22452  22453 -684 -22454 0
 22451  22452  22453 -684 -22455 0
 22451  22452  22453 -684  22456 0

c  1+1 --> 2
c    (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0 ∧  p_684) -> (-b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0)
c  in CNF:
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_2
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨  b^{228, 4}_1
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ -p_684 ∨ -b^{228, 4}_0
c  in DIMACS:
 22451  22452 -22453 -684 -22454 0
 22451  22452 -22453 -684  22455 0
 22451  22452 -22453 -684 -22456 0

c  2+1 --> break 
c    (-b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧  p_684) -> break
c  in CNF:
c     b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 22451 -22452  22453 -684 1162 0


c  2-1 --> 1
c    (-b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧ -p_684) -> (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0)
c  in CNF:
c     b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_2
c     b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_1
c     b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨  b^{228, 4}_0
c  in DIMACS:
 22451 -22452  22453  684 -22454 0
 22451 -22452  22453  684 -22455 0
 22451 -22452  22453  684  22456 0

c  1-1 --> 0
c    (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0 ∧ -p_684) -> (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧ -b^{228, 4}_0)
c  in CNF:
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_2
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_1
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_0
c  in DIMACS:
 22451  22452 -22453  684 -22454 0
 22451  22452 -22453  684 -22455 0
 22451  22452 -22453  684 -22456 0

c  0-1 --> -1
c    (-b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧ -p_684) -> ( b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0)
c  in CNF:
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨  b^{228, 4}_2
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_1
c     b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨  b^{228, 4}_0
c  in DIMACS:
 22451  22452  22453  684  22454 0
 22451  22452  22453  684 -22455 0
 22451  22452  22453  684  22456 0

c  -1-1 --> -2
c    ( b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧  b^{228, 3}_0 ∧ -p_684) -> ( b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0)
c  in CNF:
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨  b^{228, 4}_2
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨  b^{228, 4}_1
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨  p_684 ∨ -b^{228, 4}_0
c  in DIMACS:
-22451  22452 -22453  684  22454 0
-22451  22452 -22453  684  22455 0
-22451  22452 -22453  684 -22456 0

c  -2-1 --> break 
c    ( b^{228, 3}_2 ∧  b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨  b^{228, 3}_0 ∨  p_684 ∨ break
c  in DIMACS:
-22451 -22452  22453  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{228, 3}_2 ∧ -b^{228, 3}_1 ∧ -b^{228, 3}_0 ∧ true) 
c  in CNF:
c    -b^{228, 3}_2 ∨  b^{228, 3}_1 ∨  b^{228, 3}_0 ∨ false 
c  in DIMACS:
-22451  22452  22453  0

c  3 does not represent an automaton state.
c    -(-b^{228, 3}_2 ∧  b^{228, 3}_1 ∧  b^{228, 3}_0 ∧ true) 
c  in CNF:
c     b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ false 
c  in DIMACS:
 22451 -22452 -22453  0
c  -3 does not represent an automaton state.
c    -( b^{228, 3}_2 ∧  b^{228, 3}_1 ∧  b^{228, 3}_0 ∧ true) 
c  in CNF:
c    -b^{228, 3}_2 ∨ -b^{228, 3}_1 ∨ -b^{228, 3}_0 ∨ false 
c  in DIMACS:
-22451 -22452 -22453  0

c i = 4
c  -2+1 --> -1
c    ( b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧  p_912) -> ( b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0)
c  in CNF:
c    -b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨  b^{228, 5}_2
c    -b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_1
c    -b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨  b^{228, 5}_0
c  in DIMACS:
-22454 -22455  22456 -912  22457 0
-22454 -22455  22456 -912 -22458 0
-22454 -22455  22456 -912  22459 0

c  -1+1 --> 0
c    ( b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0 ∧  p_912) -> (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧ -b^{228, 5}_0)
c  in CNF:
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_2
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_1
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_0
c  in DIMACS:
-22454  22455 -22456 -912 -22457 0
-22454  22455 -22456 -912 -22458 0
-22454  22455 -22456 -912 -22459 0

c  0+1 --> 1
c    (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧  p_912) -> (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0)
c  in CNF:
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_2
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_1
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨  b^{228, 5}_0
c  in DIMACS:
 22454  22455  22456 -912 -22457 0
 22454  22455  22456 -912 -22458 0
 22454  22455  22456 -912  22459 0

c  1+1 --> 2
c    (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0 ∧  p_912) -> (-b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0)
c  in CNF:
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_2
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨  b^{228, 5}_1
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ -p_912 ∨ -b^{228, 5}_0
c  in DIMACS:
 22454  22455 -22456 -912 -22457 0
 22454  22455 -22456 -912  22458 0
 22454  22455 -22456 -912 -22459 0

c  2+1 --> break 
c    (-b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧  p_912) -> break
c  in CNF:
c     b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 22454 -22455  22456 -912 1162 0


c  2-1 --> 1
c    (-b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧ -p_912) -> (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0)
c  in CNF:
c     b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_2
c     b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_1
c     b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨  b^{228, 5}_0
c  in DIMACS:
 22454 -22455  22456  912 -22457 0
 22454 -22455  22456  912 -22458 0
 22454 -22455  22456  912  22459 0

c  1-1 --> 0
c    (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0 ∧ -p_912) -> (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧ -b^{228, 5}_0)
c  in CNF:
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_2
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_1
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_0
c  in DIMACS:
 22454  22455 -22456  912 -22457 0
 22454  22455 -22456  912 -22458 0
 22454  22455 -22456  912 -22459 0

c  0-1 --> -1
c    (-b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧ -p_912) -> ( b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0)
c  in CNF:
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨  b^{228, 5}_2
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_1
c     b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨  b^{228, 5}_0
c  in DIMACS:
 22454  22455  22456  912  22457 0
 22454  22455  22456  912 -22458 0
 22454  22455  22456  912  22459 0

c  -1-1 --> -2
c    ( b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧  b^{228, 4}_0 ∧ -p_912) -> ( b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0)
c  in CNF:
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨  b^{228, 5}_2
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨  b^{228, 5}_1
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨  p_912 ∨ -b^{228, 5}_0
c  in DIMACS:
-22454  22455 -22456  912  22457 0
-22454  22455 -22456  912  22458 0
-22454  22455 -22456  912 -22459 0

c  -2-1 --> break 
c    ( b^{228, 4}_2 ∧  b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨  b^{228, 4}_0 ∨  p_912 ∨ break
c  in DIMACS:
-22454 -22455  22456  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{228, 4}_2 ∧ -b^{228, 4}_1 ∧ -b^{228, 4}_0 ∧ true) 
c  in CNF:
c    -b^{228, 4}_2 ∨  b^{228, 4}_1 ∨  b^{228, 4}_0 ∨ false 
c  in DIMACS:
-22454  22455  22456  0

c  3 does not represent an automaton state.
c    -(-b^{228, 4}_2 ∧  b^{228, 4}_1 ∧  b^{228, 4}_0 ∧ true) 
c  in CNF:
c     b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ false 
c  in DIMACS:
 22454 -22455 -22456  0
c  -3 does not represent an automaton state.
c    -( b^{228, 4}_2 ∧  b^{228, 4}_1 ∧  b^{228, 4}_0 ∧ true) 
c  in CNF:
c    -b^{228, 4}_2 ∨ -b^{228, 4}_1 ∨ -b^{228, 4}_0 ∨ false 
c  in DIMACS:
-22454 -22455 -22456  0

c i = 5
c  -2+1 --> -1
c    ( b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧  p_1140) -> ( b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧  b^{228, 6}_0)
c  in CNF:
c    -b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨  b^{228, 6}_2
c    -b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_1
c    -b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨  b^{228, 6}_0
c  in DIMACS:
-22457 -22458  22459 -1140  22460 0
-22457 -22458  22459 -1140 -22461 0
-22457 -22458  22459 -1140  22462 0

c  -1+1 --> 0
c    ( b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0 ∧  p_1140) -> (-b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧ -b^{228, 6}_0)
c  in CNF:
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_2
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_1
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_0
c  in DIMACS:
-22457  22458 -22459 -1140 -22460 0
-22457  22458 -22459 -1140 -22461 0
-22457  22458 -22459 -1140 -22462 0

c  0+1 --> 1
c    (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧  p_1140) -> (-b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧  b^{228, 6}_0)
c  in CNF:
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_2
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_1
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨  b^{228, 6}_0
c  in DIMACS:
 22457  22458  22459 -1140 -22460 0
 22457  22458  22459 -1140 -22461 0
 22457  22458  22459 -1140  22462 0

c  1+1 --> 2
c    (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0 ∧  p_1140) -> (-b^{228, 6}_2 ∧  b^{228, 6}_1 ∧ -b^{228, 6}_0)
c  in CNF:
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_2
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨  b^{228, 6}_1
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ -p_1140 ∨ -b^{228, 6}_0
c  in DIMACS:
 22457  22458 -22459 -1140 -22460 0
 22457  22458 -22459 -1140  22461 0
 22457  22458 -22459 -1140 -22462 0

c  2+1 --> break 
c    (-b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 22457 -22458  22459 -1140 1162 0


c  2-1 --> 1
c    (-b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧ -p_1140) -> (-b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧  b^{228, 6}_0)
c  in CNF:
c     b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_2
c     b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_1
c     b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨  b^{228, 6}_0
c  in DIMACS:
 22457 -22458  22459  1140 -22460 0
 22457 -22458  22459  1140 -22461 0
 22457 -22458  22459  1140  22462 0

c  1-1 --> 0
c    (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0 ∧ -p_1140) -> (-b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧ -b^{228, 6}_0)
c  in CNF:
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_2
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_1
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_0
c  in DIMACS:
 22457  22458 -22459  1140 -22460 0
 22457  22458 -22459  1140 -22461 0
 22457  22458 -22459  1140 -22462 0

c  0-1 --> -1
c    (-b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧ -p_1140) -> ( b^{228, 6}_2 ∧ -b^{228, 6}_1 ∧  b^{228, 6}_0)
c  in CNF:
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨  b^{228, 6}_2
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_1
c     b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨  b^{228, 6}_0
c  in DIMACS:
 22457  22458  22459  1140  22460 0
 22457  22458  22459  1140 -22461 0
 22457  22458  22459  1140  22462 0

c  -1-1 --> -2
c    ( b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧  b^{228, 5}_0 ∧ -p_1140) -> ( b^{228, 6}_2 ∧  b^{228, 6}_1 ∧ -b^{228, 6}_0)
c  in CNF:
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨  b^{228, 6}_2
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨  b^{228, 6}_1
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨  p_1140 ∨ -b^{228, 6}_0
c  in DIMACS:
-22457  22458 -22459  1140  22460 0
-22457  22458 -22459  1140  22461 0
-22457  22458 -22459  1140 -22462 0

c  -2-1 --> break 
c    ( b^{228, 5}_2 ∧  b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨  b^{228, 5}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-22457 -22458  22459  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{228, 5}_2 ∧ -b^{228, 5}_1 ∧ -b^{228, 5}_0 ∧ true) 
c  in CNF:
c    -b^{228, 5}_2 ∨  b^{228, 5}_1 ∨  b^{228, 5}_0 ∨ false 
c  in DIMACS:
-22457  22458  22459  0

c  3 does not represent an automaton state.
c    -(-b^{228, 5}_2 ∧  b^{228, 5}_1 ∧  b^{228, 5}_0 ∧ true) 
c  in CNF:
c     b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ false 
c  in DIMACS:
 22457 -22458 -22459  0
c  -3 does not represent an automaton state.
c    -( b^{228, 5}_2 ∧  b^{228, 5}_1 ∧  b^{228, 5}_0 ∧ true) 
c  in CNF:
c    -b^{228, 5}_2 ∨ -b^{228, 5}_1 ∨ -b^{228, 5}_0 ∨ false 
c  in DIMACS:
-22457 -22458 -22459  0

c INIT for k = 229
c    -b^{229, 1}_2
c    -b^{229, 1}_1
c    -b^{229, 1}_0
c  in DIMACS:
-22463 0
-22464 0
-22465 0

c Transitions for k = 229
c i = 1
c  -2+1 --> -1
c    ( b^{229, 1}_2 ∧  b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧  p_229) -> ( b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0)
c  in CNF:
c    -b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨  b^{229, 2}_2
c    -b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_1
c    -b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨  b^{229, 2}_0
c  in DIMACS:
-22463 -22464  22465 -229  22466 0
-22463 -22464  22465 -229 -22467 0
-22463 -22464  22465 -229  22468 0

c  -1+1 --> 0
c    ( b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧  b^{229, 1}_0 ∧  p_229) -> (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧ -b^{229, 2}_0)
c  in CNF:
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_2
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_1
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_0
c  in DIMACS:
-22463  22464 -22465 -229 -22466 0
-22463  22464 -22465 -229 -22467 0
-22463  22464 -22465 -229 -22468 0

c  0+1 --> 1
c    (-b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧  p_229) -> (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0)
c  in CNF:
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_2
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_1
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨  b^{229, 2}_0
c  in DIMACS:
 22463  22464  22465 -229 -22466 0
 22463  22464  22465 -229 -22467 0
 22463  22464  22465 -229  22468 0

c  1+1 --> 2
c    (-b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧  b^{229, 1}_0 ∧  p_229) -> (-b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0)
c  in CNF:
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_2
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨  b^{229, 2}_1
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ -p_229 ∨ -b^{229, 2}_0
c  in DIMACS:
 22463  22464 -22465 -229 -22466 0
 22463  22464 -22465 -229  22467 0
 22463  22464 -22465 -229 -22468 0

c  2+1 --> break 
c    (-b^{229, 1}_2 ∧  b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧  p_229) -> break
c  in CNF:
c     b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ -p_229 ∨ break
c  in DIMACS:
 22463 -22464  22465 -229 1162 0


c  2-1 --> 1
c    (-b^{229, 1}_2 ∧  b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧ -p_229) -> (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0)
c  in CNF:
c     b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_2
c     b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_1
c     b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨  b^{229, 2}_0
c  in DIMACS:
 22463 -22464  22465  229 -22466 0
 22463 -22464  22465  229 -22467 0
 22463 -22464  22465  229  22468 0

c  1-1 --> 0
c    (-b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧  b^{229, 1}_0 ∧ -p_229) -> (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧ -b^{229, 2}_0)
c  in CNF:
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_2
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_1
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_0
c  in DIMACS:
 22463  22464 -22465  229 -22466 0
 22463  22464 -22465  229 -22467 0
 22463  22464 -22465  229 -22468 0

c  0-1 --> -1
c    (-b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧ -p_229) -> ( b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0)
c  in CNF:
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨  b^{229, 2}_2
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_1
c     b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨  b^{229, 2}_0
c  in DIMACS:
 22463  22464  22465  229  22466 0
 22463  22464  22465  229 -22467 0
 22463  22464  22465  229  22468 0

c  -1-1 --> -2
c    ( b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧  b^{229, 1}_0 ∧ -p_229) -> ( b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0)
c  in CNF:
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨  b^{229, 2}_2
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨  b^{229, 2}_1
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨  p_229 ∨ -b^{229, 2}_0
c  in DIMACS:
-22463  22464 -22465  229  22466 0
-22463  22464 -22465  229  22467 0
-22463  22464 -22465  229 -22468 0

c  -2-1 --> break 
c    ( b^{229, 1}_2 ∧  b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧ -p_229) -> break
c  in CNF:
c    -b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨  b^{229, 1}_0 ∨  p_229 ∨ break
c  in DIMACS:
-22463 -22464  22465  229 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{229, 1}_2 ∧ -b^{229, 1}_1 ∧ -b^{229, 1}_0 ∧ true) 
c  in CNF:
c    -b^{229, 1}_2 ∨  b^{229, 1}_1 ∨  b^{229, 1}_0 ∨ false 
c  in DIMACS:
-22463  22464  22465  0

c  3 does not represent an automaton state.
c    -(-b^{229, 1}_2 ∧  b^{229, 1}_1 ∧  b^{229, 1}_0 ∧ true) 
c  in CNF:
c     b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ false 
c  in DIMACS:
 22463 -22464 -22465  0
c  -3 does not represent an automaton state.
c    -( b^{229, 1}_2 ∧  b^{229, 1}_1 ∧  b^{229, 1}_0 ∧ true) 
c  in CNF:
c    -b^{229, 1}_2 ∨ -b^{229, 1}_1 ∨ -b^{229, 1}_0 ∨ false 
c  in DIMACS:
-22463 -22464 -22465  0

c i = 2
c  -2+1 --> -1
c    ( b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧  p_458) -> ( b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0)
c  in CNF:
c    -b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨  b^{229, 3}_2
c    -b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_1
c    -b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨  b^{229, 3}_0
c  in DIMACS:
-22466 -22467  22468 -458  22469 0
-22466 -22467  22468 -458 -22470 0
-22466 -22467  22468 -458  22471 0

c  -1+1 --> 0
c    ( b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0 ∧  p_458) -> (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧ -b^{229, 3}_0)
c  in CNF:
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_2
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_1
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_0
c  in DIMACS:
-22466  22467 -22468 -458 -22469 0
-22466  22467 -22468 -458 -22470 0
-22466  22467 -22468 -458 -22471 0

c  0+1 --> 1
c    (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧  p_458) -> (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0)
c  in CNF:
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_2
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_1
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨  b^{229, 3}_0
c  in DIMACS:
 22466  22467  22468 -458 -22469 0
 22466  22467  22468 -458 -22470 0
 22466  22467  22468 -458  22471 0

c  1+1 --> 2
c    (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0 ∧  p_458) -> (-b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0)
c  in CNF:
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_2
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨  b^{229, 3}_1
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ -p_458 ∨ -b^{229, 3}_0
c  in DIMACS:
 22466  22467 -22468 -458 -22469 0
 22466  22467 -22468 -458  22470 0
 22466  22467 -22468 -458 -22471 0

c  2+1 --> break 
c    (-b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧  p_458) -> break
c  in CNF:
c     b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ -p_458 ∨ break
c  in DIMACS:
 22466 -22467  22468 -458 1162 0


c  2-1 --> 1
c    (-b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧ -p_458) -> (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0)
c  in CNF:
c     b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_2
c     b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_1
c     b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨  b^{229, 3}_0
c  in DIMACS:
 22466 -22467  22468  458 -22469 0
 22466 -22467  22468  458 -22470 0
 22466 -22467  22468  458  22471 0

c  1-1 --> 0
c    (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0 ∧ -p_458) -> (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧ -b^{229, 3}_0)
c  in CNF:
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_2
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_1
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_0
c  in DIMACS:
 22466  22467 -22468  458 -22469 0
 22466  22467 -22468  458 -22470 0
 22466  22467 -22468  458 -22471 0

c  0-1 --> -1
c    (-b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧ -p_458) -> ( b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0)
c  in CNF:
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨  b^{229, 3}_2
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_1
c     b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨  b^{229, 3}_0
c  in DIMACS:
 22466  22467  22468  458  22469 0
 22466  22467  22468  458 -22470 0
 22466  22467  22468  458  22471 0

c  -1-1 --> -2
c    ( b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧  b^{229, 2}_0 ∧ -p_458) -> ( b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0)
c  in CNF:
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨  b^{229, 3}_2
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨  b^{229, 3}_1
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨  p_458 ∨ -b^{229, 3}_0
c  in DIMACS:
-22466  22467 -22468  458  22469 0
-22466  22467 -22468  458  22470 0
-22466  22467 -22468  458 -22471 0

c  -2-1 --> break 
c    ( b^{229, 2}_2 ∧  b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧ -p_458) -> break
c  in CNF:
c    -b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨  b^{229, 2}_0 ∨  p_458 ∨ break
c  in DIMACS:
-22466 -22467  22468  458 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{229, 2}_2 ∧ -b^{229, 2}_1 ∧ -b^{229, 2}_0 ∧ true) 
c  in CNF:
c    -b^{229, 2}_2 ∨  b^{229, 2}_1 ∨  b^{229, 2}_0 ∨ false 
c  in DIMACS:
-22466  22467  22468  0

c  3 does not represent an automaton state.
c    -(-b^{229, 2}_2 ∧  b^{229, 2}_1 ∧  b^{229, 2}_0 ∧ true) 
c  in CNF:
c     b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ false 
c  in DIMACS:
 22466 -22467 -22468  0
c  -3 does not represent an automaton state.
c    -( b^{229, 2}_2 ∧  b^{229, 2}_1 ∧  b^{229, 2}_0 ∧ true) 
c  in CNF:
c    -b^{229, 2}_2 ∨ -b^{229, 2}_1 ∨ -b^{229, 2}_0 ∨ false 
c  in DIMACS:
-22466 -22467 -22468  0

c i = 3
c  -2+1 --> -1
c    ( b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧  p_687) -> ( b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0)
c  in CNF:
c    -b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨  b^{229, 4}_2
c    -b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_1
c    -b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨  b^{229, 4}_0
c  in DIMACS:
-22469 -22470  22471 -687  22472 0
-22469 -22470  22471 -687 -22473 0
-22469 -22470  22471 -687  22474 0

c  -1+1 --> 0
c    ( b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0 ∧  p_687) -> (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧ -b^{229, 4}_0)
c  in CNF:
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_2
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_1
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_0
c  in DIMACS:
-22469  22470 -22471 -687 -22472 0
-22469  22470 -22471 -687 -22473 0
-22469  22470 -22471 -687 -22474 0

c  0+1 --> 1
c    (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧  p_687) -> (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0)
c  in CNF:
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_2
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_1
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨  b^{229, 4}_0
c  in DIMACS:
 22469  22470  22471 -687 -22472 0
 22469  22470  22471 -687 -22473 0
 22469  22470  22471 -687  22474 0

c  1+1 --> 2
c    (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0 ∧  p_687) -> (-b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0)
c  in CNF:
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_2
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨  b^{229, 4}_1
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ -p_687 ∨ -b^{229, 4}_0
c  in DIMACS:
 22469  22470 -22471 -687 -22472 0
 22469  22470 -22471 -687  22473 0
 22469  22470 -22471 -687 -22474 0

c  2+1 --> break 
c    (-b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧  p_687) -> break
c  in CNF:
c     b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ -p_687 ∨ break
c  in DIMACS:
 22469 -22470  22471 -687 1162 0


c  2-1 --> 1
c    (-b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧ -p_687) -> (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0)
c  in CNF:
c     b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_2
c     b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_1
c     b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨  b^{229, 4}_0
c  in DIMACS:
 22469 -22470  22471  687 -22472 0
 22469 -22470  22471  687 -22473 0
 22469 -22470  22471  687  22474 0

c  1-1 --> 0
c    (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0 ∧ -p_687) -> (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧ -b^{229, 4}_0)
c  in CNF:
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_2
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_1
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_0
c  in DIMACS:
 22469  22470 -22471  687 -22472 0
 22469  22470 -22471  687 -22473 0
 22469  22470 -22471  687 -22474 0

c  0-1 --> -1
c    (-b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧ -p_687) -> ( b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0)
c  in CNF:
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨  b^{229, 4}_2
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_1
c     b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨  b^{229, 4}_0
c  in DIMACS:
 22469  22470  22471  687  22472 0
 22469  22470  22471  687 -22473 0
 22469  22470  22471  687  22474 0

c  -1-1 --> -2
c    ( b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧  b^{229, 3}_0 ∧ -p_687) -> ( b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0)
c  in CNF:
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨  b^{229, 4}_2
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨  b^{229, 4}_1
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨  p_687 ∨ -b^{229, 4}_0
c  in DIMACS:
-22469  22470 -22471  687  22472 0
-22469  22470 -22471  687  22473 0
-22469  22470 -22471  687 -22474 0

c  -2-1 --> break 
c    ( b^{229, 3}_2 ∧  b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧ -p_687) -> break
c  in CNF:
c    -b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨  b^{229, 3}_0 ∨  p_687 ∨ break
c  in DIMACS:
-22469 -22470  22471  687 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{229, 3}_2 ∧ -b^{229, 3}_1 ∧ -b^{229, 3}_0 ∧ true) 
c  in CNF:
c    -b^{229, 3}_2 ∨  b^{229, 3}_1 ∨  b^{229, 3}_0 ∨ false 
c  in DIMACS:
-22469  22470  22471  0

c  3 does not represent an automaton state.
c    -(-b^{229, 3}_2 ∧  b^{229, 3}_1 ∧  b^{229, 3}_0 ∧ true) 
c  in CNF:
c     b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ false 
c  in DIMACS:
 22469 -22470 -22471  0
c  -3 does not represent an automaton state.
c    -( b^{229, 3}_2 ∧  b^{229, 3}_1 ∧  b^{229, 3}_0 ∧ true) 
c  in CNF:
c    -b^{229, 3}_2 ∨ -b^{229, 3}_1 ∨ -b^{229, 3}_0 ∨ false 
c  in DIMACS:
-22469 -22470 -22471  0

c i = 4
c  -2+1 --> -1
c    ( b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧  p_916) -> ( b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0)
c  in CNF:
c    -b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨  b^{229, 5}_2
c    -b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_1
c    -b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨  b^{229, 5}_0
c  in DIMACS:
-22472 -22473  22474 -916  22475 0
-22472 -22473  22474 -916 -22476 0
-22472 -22473  22474 -916  22477 0

c  -1+1 --> 0
c    ( b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0 ∧  p_916) -> (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧ -b^{229, 5}_0)
c  in CNF:
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_2
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_1
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_0
c  in DIMACS:
-22472  22473 -22474 -916 -22475 0
-22472  22473 -22474 -916 -22476 0
-22472  22473 -22474 -916 -22477 0

c  0+1 --> 1
c    (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧  p_916) -> (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0)
c  in CNF:
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_2
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_1
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨  b^{229, 5}_0
c  in DIMACS:
 22472  22473  22474 -916 -22475 0
 22472  22473  22474 -916 -22476 0
 22472  22473  22474 -916  22477 0

c  1+1 --> 2
c    (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0 ∧  p_916) -> (-b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0)
c  in CNF:
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_2
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨  b^{229, 5}_1
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ -p_916 ∨ -b^{229, 5}_0
c  in DIMACS:
 22472  22473 -22474 -916 -22475 0
 22472  22473 -22474 -916  22476 0
 22472  22473 -22474 -916 -22477 0

c  2+1 --> break 
c    (-b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧  p_916) -> break
c  in CNF:
c     b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ -p_916 ∨ break
c  in DIMACS:
 22472 -22473  22474 -916 1162 0


c  2-1 --> 1
c    (-b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧ -p_916) -> (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0)
c  in CNF:
c     b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_2
c     b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_1
c     b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨  b^{229, 5}_0
c  in DIMACS:
 22472 -22473  22474  916 -22475 0
 22472 -22473  22474  916 -22476 0
 22472 -22473  22474  916  22477 0

c  1-1 --> 0
c    (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0 ∧ -p_916) -> (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧ -b^{229, 5}_0)
c  in CNF:
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_2
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_1
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_0
c  in DIMACS:
 22472  22473 -22474  916 -22475 0
 22472  22473 -22474  916 -22476 0
 22472  22473 -22474  916 -22477 0

c  0-1 --> -1
c    (-b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧ -p_916) -> ( b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0)
c  in CNF:
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨  b^{229, 5}_2
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_1
c     b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨  b^{229, 5}_0
c  in DIMACS:
 22472  22473  22474  916  22475 0
 22472  22473  22474  916 -22476 0
 22472  22473  22474  916  22477 0

c  -1-1 --> -2
c    ( b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧  b^{229, 4}_0 ∧ -p_916) -> ( b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0)
c  in CNF:
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨  b^{229, 5}_2
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨  b^{229, 5}_1
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨  p_916 ∨ -b^{229, 5}_0
c  in DIMACS:
-22472  22473 -22474  916  22475 0
-22472  22473 -22474  916  22476 0
-22472  22473 -22474  916 -22477 0

c  -2-1 --> break 
c    ( b^{229, 4}_2 ∧  b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧ -p_916) -> break
c  in CNF:
c    -b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨  b^{229, 4}_0 ∨  p_916 ∨ break
c  in DIMACS:
-22472 -22473  22474  916 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{229, 4}_2 ∧ -b^{229, 4}_1 ∧ -b^{229, 4}_0 ∧ true) 
c  in CNF:
c    -b^{229, 4}_2 ∨  b^{229, 4}_1 ∨  b^{229, 4}_0 ∨ false 
c  in DIMACS:
-22472  22473  22474  0

c  3 does not represent an automaton state.
c    -(-b^{229, 4}_2 ∧  b^{229, 4}_1 ∧  b^{229, 4}_0 ∧ true) 
c  in CNF:
c     b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ false 
c  in DIMACS:
 22472 -22473 -22474  0
c  -3 does not represent an automaton state.
c    -( b^{229, 4}_2 ∧  b^{229, 4}_1 ∧  b^{229, 4}_0 ∧ true) 
c  in CNF:
c    -b^{229, 4}_2 ∨ -b^{229, 4}_1 ∨ -b^{229, 4}_0 ∨ false 
c  in DIMACS:
-22472 -22473 -22474  0

c i = 5
c  -2+1 --> -1
c    ( b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧  p_1145) -> ( b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧  b^{229, 6}_0)
c  in CNF:
c    -b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨  b^{229, 6}_2
c    -b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_1
c    -b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨  b^{229, 6}_0
c  in DIMACS:
-22475 -22476  22477 -1145  22478 0
-22475 -22476  22477 -1145 -22479 0
-22475 -22476  22477 -1145  22480 0

c  -1+1 --> 0
c    ( b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0 ∧  p_1145) -> (-b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧ -b^{229, 6}_0)
c  in CNF:
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_2
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_1
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_0
c  in DIMACS:
-22475  22476 -22477 -1145 -22478 0
-22475  22476 -22477 -1145 -22479 0
-22475  22476 -22477 -1145 -22480 0

c  0+1 --> 1
c    (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧  p_1145) -> (-b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧  b^{229, 6}_0)
c  in CNF:
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_2
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_1
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨  b^{229, 6}_0
c  in DIMACS:
 22475  22476  22477 -1145 -22478 0
 22475  22476  22477 -1145 -22479 0
 22475  22476  22477 -1145  22480 0

c  1+1 --> 2
c    (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0 ∧  p_1145) -> (-b^{229, 6}_2 ∧  b^{229, 6}_1 ∧ -b^{229, 6}_0)
c  in CNF:
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_2
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨  b^{229, 6}_1
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ -p_1145 ∨ -b^{229, 6}_0
c  in DIMACS:
 22475  22476 -22477 -1145 -22478 0
 22475  22476 -22477 -1145  22479 0
 22475  22476 -22477 -1145 -22480 0

c  2+1 --> break 
c    (-b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧  p_1145) -> break
c  in CNF:
c     b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ -p_1145 ∨ break
c  in DIMACS:
 22475 -22476  22477 -1145 1162 0


c  2-1 --> 1
c    (-b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧ -p_1145) -> (-b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧  b^{229, 6}_0)
c  in CNF:
c     b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_2
c     b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_1
c     b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨  b^{229, 6}_0
c  in DIMACS:
 22475 -22476  22477  1145 -22478 0
 22475 -22476  22477  1145 -22479 0
 22475 -22476  22477  1145  22480 0

c  1-1 --> 0
c    (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0 ∧ -p_1145) -> (-b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧ -b^{229, 6}_0)
c  in CNF:
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_2
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_1
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_0
c  in DIMACS:
 22475  22476 -22477  1145 -22478 0
 22475  22476 -22477  1145 -22479 0
 22475  22476 -22477  1145 -22480 0

c  0-1 --> -1
c    (-b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧ -p_1145) -> ( b^{229, 6}_2 ∧ -b^{229, 6}_1 ∧  b^{229, 6}_0)
c  in CNF:
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨  b^{229, 6}_2
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_1
c     b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨  b^{229, 6}_0
c  in DIMACS:
 22475  22476  22477  1145  22478 0
 22475  22476  22477  1145 -22479 0
 22475  22476  22477  1145  22480 0

c  -1-1 --> -2
c    ( b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧  b^{229, 5}_0 ∧ -p_1145) -> ( b^{229, 6}_2 ∧  b^{229, 6}_1 ∧ -b^{229, 6}_0)
c  in CNF:
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨  b^{229, 6}_2
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨  b^{229, 6}_1
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨  p_1145 ∨ -b^{229, 6}_0
c  in DIMACS:
-22475  22476 -22477  1145  22478 0
-22475  22476 -22477  1145  22479 0
-22475  22476 -22477  1145 -22480 0

c  -2-1 --> break 
c    ( b^{229, 5}_2 ∧  b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧ -p_1145) -> break
c  in CNF:
c    -b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨  b^{229, 5}_0 ∨  p_1145 ∨ break
c  in DIMACS:
-22475 -22476  22477  1145 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{229, 5}_2 ∧ -b^{229, 5}_1 ∧ -b^{229, 5}_0 ∧ true) 
c  in CNF:
c    -b^{229, 5}_2 ∨  b^{229, 5}_1 ∨  b^{229, 5}_0 ∨ false 
c  in DIMACS:
-22475  22476  22477  0

c  3 does not represent an automaton state.
c    -(-b^{229, 5}_2 ∧  b^{229, 5}_1 ∧  b^{229, 5}_0 ∧ true) 
c  in CNF:
c     b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ false 
c  in DIMACS:
 22475 -22476 -22477  0
c  -3 does not represent an automaton state.
c    -( b^{229, 5}_2 ∧  b^{229, 5}_1 ∧  b^{229, 5}_0 ∧ true) 
c  in CNF:
c    -b^{229, 5}_2 ∨ -b^{229, 5}_1 ∨ -b^{229, 5}_0 ∨ false 
c  in DIMACS:
-22475 -22476 -22477  0

c INIT for k = 230
c    -b^{230, 1}_2
c    -b^{230, 1}_1
c    -b^{230, 1}_0
c  in DIMACS:
-22481 0
-22482 0
-22483 0

c Transitions for k = 230
c i = 1
c  -2+1 --> -1
c    ( b^{230, 1}_2 ∧  b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧  p_230) -> ( b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0)
c  in CNF:
c    -b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨  b^{230, 2}_2
c    -b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_1
c    -b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨  b^{230, 2}_0
c  in DIMACS:
-22481 -22482  22483 -230  22484 0
-22481 -22482  22483 -230 -22485 0
-22481 -22482  22483 -230  22486 0

c  -1+1 --> 0
c    ( b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧  b^{230, 1}_0 ∧  p_230) -> (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧ -b^{230, 2}_0)
c  in CNF:
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_2
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_1
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_0
c  in DIMACS:
-22481  22482 -22483 -230 -22484 0
-22481  22482 -22483 -230 -22485 0
-22481  22482 -22483 -230 -22486 0

c  0+1 --> 1
c    (-b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧  p_230) -> (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0)
c  in CNF:
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_2
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_1
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨  b^{230, 2}_0
c  in DIMACS:
 22481  22482  22483 -230 -22484 0
 22481  22482  22483 -230 -22485 0
 22481  22482  22483 -230  22486 0

c  1+1 --> 2
c    (-b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧  b^{230, 1}_0 ∧  p_230) -> (-b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0)
c  in CNF:
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_2
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨  b^{230, 2}_1
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ -p_230 ∨ -b^{230, 2}_0
c  in DIMACS:
 22481  22482 -22483 -230 -22484 0
 22481  22482 -22483 -230  22485 0
 22481  22482 -22483 -230 -22486 0

c  2+1 --> break 
c    (-b^{230, 1}_2 ∧  b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧  p_230) -> break
c  in CNF:
c     b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ -p_230 ∨ break
c  in DIMACS:
 22481 -22482  22483 -230 1162 0


c  2-1 --> 1
c    (-b^{230, 1}_2 ∧  b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧ -p_230) -> (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0)
c  in CNF:
c     b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_2
c     b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_1
c     b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨  b^{230, 2}_0
c  in DIMACS:
 22481 -22482  22483  230 -22484 0
 22481 -22482  22483  230 -22485 0
 22481 -22482  22483  230  22486 0

c  1-1 --> 0
c    (-b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧  b^{230, 1}_0 ∧ -p_230) -> (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧ -b^{230, 2}_0)
c  in CNF:
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_2
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_1
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_0
c  in DIMACS:
 22481  22482 -22483  230 -22484 0
 22481  22482 -22483  230 -22485 0
 22481  22482 -22483  230 -22486 0

c  0-1 --> -1
c    (-b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧ -p_230) -> ( b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0)
c  in CNF:
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨  b^{230, 2}_2
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_1
c     b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨  b^{230, 2}_0
c  in DIMACS:
 22481  22482  22483  230  22484 0
 22481  22482  22483  230 -22485 0
 22481  22482  22483  230  22486 0

c  -1-1 --> -2
c    ( b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧  b^{230, 1}_0 ∧ -p_230) -> ( b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0)
c  in CNF:
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨  b^{230, 2}_2
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨  b^{230, 2}_1
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨  p_230 ∨ -b^{230, 2}_0
c  in DIMACS:
-22481  22482 -22483  230  22484 0
-22481  22482 -22483  230  22485 0
-22481  22482 -22483  230 -22486 0

c  -2-1 --> break 
c    ( b^{230, 1}_2 ∧  b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧ -p_230) -> break
c  in CNF:
c    -b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨  b^{230, 1}_0 ∨  p_230 ∨ break
c  in DIMACS:
-22481 -22482  22483  230 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{230, 1}_2 ∧ -b^{230, 1}_1 ∧ -b^{230, 1}_0 ∧ true) 
c  in CNF:
c    -b^{230, 1}_2 ∨  b^{230, 1}_1 ∨  b^{230, 1}_0 ∨ false 
c  in DIMACS:
-22481  22482  22483  0

c  3 does not represent an automaton state.
c    -(-b^{230, 1}_2 ∧  b^{230, 1}_1 ∧  b^{230, 1}_0 ∧ true) 
c  in CNF:
c     b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ false 
c  in DIMACS:
 22481 -22482 -22483  0
c  -3 does not represent an automaton state.
c    -( b^{230, 1}_2 ∧  b^{230, 1}_1 ∧  b^{230, 1}_0 ∧ true) 
c  in CNF:
c    -b^{230, 1}_2 ∨ -b^{230, 1}_1 ∨ -b^{230, 1}_0 ∨ false 
c  in DIMACS:
-22481 -22482 -22483  0

c i = 2
c  -2+1 --> -1
c    ( b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧  p_460) -> ( b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0)
c  in CNF:
c    -b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨  b^{230, 3}_2
c    -b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_1
c    -b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨  b^{230, 3}_0
c  in DIMACS:
-22484 -22485  22486 -460  22487 0
-22484 -22485  22486 -460 -22488 0
-22484 -22485  22486 -460  22489 0

c  -1+1 --> 0
c    ( b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0 ∧  p_460) -> (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧ -b^{230, 3}_0)
c  in CNF:
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_2
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_1
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_0
c  in DIMACS:
-22484  22485 -22486 -460 -22487 0
-22484  22485 -22486 -460 -22488 0
-22484  22485 -22486 -460 -22489 0

c  0+1 --> 1
c    (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧  p_460) -> (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0)
c  in CNF:
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_2
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_1
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨  b^{230, 3}_0
c  in DIMACS:
 22484  22485  22486 -460 -22487 0
 22484  22485  22486 -460 -22488 0
 22484  22485  22486 -460  22489 0

c  1+1 --> 2
c    (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0 ∧  p_460) -> (-b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0)
c  in CNF:
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_2
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨  b^{230, 3}_1
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ -p_460 ∨ -b^{230, 3}_0
c  in DIMACS:
 22484  22485 -22486 -460 -22487 0
 22484  22485 -22486 -460  22488 0
 22484  22485 -22486 -460 -22489 0

c  2+1 --> break 
c    (-b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧  p_460) -> break
c  in CNF:
c     b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ -p_460 ∨ break
c  in DIMACS:
 22484 -22485  22486 -460 1162 0


c  2-1 --> 1
c    (-b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧ -p_460) -> (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0)
c  in CNF:
c     b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_2
c     b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_1
c     b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨  b^{230, 3}_0
c  in DIMACS:
 22484 -22485  22486  460 -22487 0
 22484 -22485  22486  460 -22488 0
 22484 -22485  22486  460  22489 0

c  1-1 --> 0
c    (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0 ∧ -p_460) -> (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧ -b^{230, 3}_0)
c  in CNF:
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_2
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_1
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_0
c  in DIMACS:
 22484  22485 -22486  460 -22487 0
 22484  22485 -22486  460 -22488 0
 22484  22485 -22486  460 -22489 0

c  0-1 --> -1
c    (-b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧ -p_460) -> ( b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0)
c  in CNF:
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨  b^{230, 3}_2
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_1
c     b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨  b^{230, 3}_0
c  in DIMACS:
 22484  22485  22486  460  22487 0
 22484  22485  22486  460 -22488 0
 22484  22485  22486  460  22489 0

c  -1-1 --> -2
c    ( b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧  b^{230, 2}_0 ∧ -p_460) -> ( b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0)
c  in CNF:
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨  b^{230, 3}_2
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨  b^{230, 3}_1
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨  p_460 ∨ -b^{230, 3}_0
c  in DIMACS:
-22484  22485 -22486  460  22487 0
-22484  22485 -22486  460  22488 0
-22484  22485 -22486  460 -22489 0

c  -2-1 --> break 
c    ( b^{230, 2}_2 ∧  b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧ -p_460) -> break
c  in CNF:
c    -b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨  b^{230, 2}_0 ∨  p_460 ∨ break
c  in DIMACS:
-22484 -22485  22486  460 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{230, 2}_2 ∧ -b^{230, 2}_1 ∧ -b^{230, 2}_0 ∧ true) 
c  in CNF:
c    -b^{230, 2}_2 ∨  b^{230, 2}_1 ∨  b^{230, 2}_0 ∨ false 
c  in DIMACS:
-22484  22485  22486  0

c  3 does not represent an automaton state.
c    -(-b^{230, 2}_2 ∧  b^{230, 2}_1 ∧  b^{230, 2}_0 ∧ true) 
c  in CNF:
c     b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ false 
c  in DIMACS:
 22484 -22485 -22486  0
c  -3 does not represent an automaton state.
c    -( b^{230, 2}_2 ∧  b^{230, 2}_1 ∧  b^{230, 2}_0 ∧ true) 
c  in CNF:
c    -b^{230, 2}_2 ∨ -b^{230, 2}_1 ∨ -b^{230, 2}_0 ∨ false 
c  in DIMACS:
-22484 -22485 -22486  0

c i = 3
c  -2+1 --> -1
c    ( b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧  p_690) -> ( b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0)
c  in CNF:
c    -b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨  b^{230, 4}_2
c    -b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_1
c    -b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨  b^{230, 4}_0
c  in DIMACS:
-22487 -22488  22489 -690  22490 0
-22487 -22488  22489 -690 -22491 0
-22487 -22488  22489 -690  22492 0

c  -1+1 --> 0
c    ( b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0 ∧  p_690) -> (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧ -b^{230, 4}_0)
c  in CNF:
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_2
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_1
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_0
c  in DIMACS:
-22487  22488 -22489 -690 -22490 0
-22487  22488 -22489 -690 -22491 0
-22487  22488 -22489 -690 -22492 0

c  0+1 --> 1
c    (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧  p_690) -> (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0)
c  in CNF:
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_2
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_1
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨  b^{230, 4}_0
c  in DIMACS:
 22487  22488  22489 -690 -22490 0
 22487  22488  22489 -690 -22491 0
 22487  22488  22489 -690  22492 0

c  1+1 --> 2
c    (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0 ∧  p_690) -> (-b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0)
c  in CNF:
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_2
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨  b^{230, 4}_1
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ -p_690 ∨ -b^{230, 4}_0
c  in DIMACS:
 22487  22488 -22489 -690 -22490 0
 22487  22488 -22489 -690  22491 0
 22487  22488 -22489 -690 -22492 0

c  2+1 --> break 
c    (-b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧  p_690) -> break
c  in CNF:
c     b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 22487 -22488  22489 -690 1162 0


c  2-1 --> 1
c    (-b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧ -p_690) -> (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0)
c  in CNF:
c     b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_2
c     b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_1
c     b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨  b^{230, 4}_0
c  in DIMACS:
 22487 -22488  22489  690 -22490 0
 22487 -22488  22489  690 -22491 0
 22487 -22488  22489  690  22492 0

c  1-1 --> 0
c    (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0 ∧ -p_690) -> (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧ -b^{230, 4}_0)
c  in CNF:
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_2
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_1
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_0
c  in DIMACS:
 22487  22488 -22489  690 -22490 0
 22487  22488 -22489  690 -22491 0
 22487  22488 -22489  690 -22492 0

c  0-1 --> -1
c    (-b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧ -p_690) -> ( b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0)
c  in CNF:
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨  b^{230, 4}_2
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_1
c     b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨  b^{230, 4}_0
c  in DIMACS:
 22487  22488  22489  690  22490 0
 22487  22488  22489  690 -22491 0
 22487  22488  22489  690  22492 0

c  -1-1 --> -2
c    ( b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧  b^{230, 3}_0 ∧ -p_690) -> ( b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0)
c  in CNF:
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨  b^{230, 4}_2
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨  b^{230, 4}_1
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨  p_690 ∨ -b^{230, 4}_0
c  in DIMACS:
-22487  22488 -22489  690  22490 0
-22487  22488 -22489  690  22491 0
-22487  22488 -22489  690 -22492 0

c  -2-1 --> break 
c    ( b^{230, 3}_2 ∧  b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨  b^{230, 3}_0 ∨  p_690 ∨ break
c  in DIMACS:
-22487 -22488  22489  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{230, 3}_2 ∧ -b^{230, 3}_1 ∧ -b^{230, 3}_0 ∧ true) 
c  in CNF:
c    -b^{230, 3}_2 ∨  b^{230, 3}_1 ∨  b^{230, 3}_0 ∨ false 
c  in DIMACS:
-22487  22488  22489  0

c  3 does not represent an automaton state.
c    -(-b^{230, 3}_2 ∧  b^{230, 3}_1 ∧  b^{230, 3}_0 ∧ true) 
c  in CNF:
c     b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ false 
c  in DIMACS:
 22487 -22488 -22489  0
c  -3 does not represent an automaton state.
c    -( b^{230, 3}_2 ∧  b^{230, 3}_1 ∧  b^{230, 3}_0 ∧ true) 
c  in CNF:
c    -b^{230, 3}_2 ∨ -b^{230, 3}_1 ∨ -b^{230, 3}_0 ∨ false 
c  in DIMACS:
-22487 -22488 -22489  0

c i = 4
c  -2+1 --> -1
c    ( b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧  p_920) -> ( b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0)
c  in CNF:
c    -b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨  b^{230, 5}_2
c    -b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_1
c    -b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨  b^{230, 5}_0
c  in DIMACS:
-22490 -22491  22492 -920  22493 0
-22490 -22491  22492 -920 -22494 0
-22490 -22491  22492 -920  22495 0

c  -1+1 --> 0
c    ( b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0 ∧  p_920) -> (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧ -b^{230, 5}_0)
c  in CNF:
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_2
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_1
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_0
c  in DIMACS:
-22490  22491 -22492 -920 -22493 0
-22490  22491 -22492 -920 -22494 0
-22490  22491 -22492 -920 -22495 0

c  0+1 --> 1
c    (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧  p_920) -> (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0)
c  in CNF:
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_2
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_1
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨  b^{230, 5}_0
c  in DIMACS:
 22490  22491  22492 -920 -22493 0
 22490  22491  22492 -920 -22494 0
 22490  22491  22492 -920  22495 0

c  1+1 --> 2
c    (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0 ∧  p_920) -> (-b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0)
c  in CNF:
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_2
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨  b^{230, 5}_1
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ -p_920 ∨ -b^{230, 5}_0
c  in DIMACS:
 22490  22491 -22492 -920 -22493 0
 22490  22491 -22492 -920  22494 0
 22490  22491 -22492 -920 -22495 0

c  2+1 --> break 
c    (-b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧  p_920) -> break
c  in CNF:
c     b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ -p_920 ∨ break
c  in DIMACS:
 22490 -22491  22492 -920 1162 0


c  2-1 --> 1
c    (-b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧ -p_920) -> (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0)
c  in CNF:
c     b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_2
c     b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_1
c     b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨  b^{230, 5}_0
c  in DIMACS:
 22490 -22491  22492  920 -22493 0
 22490 -22491  22492  920 -22494 0
 22490 -22491  22492  920  22495 0

c  1-1 --> 0
c    (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0 ∧ -p_920) -> (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧ -b^{230, 5}_0)
c  in CNF:
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_2
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_1
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_0
c  in DIMACS:
 22490  22491 -22492  920 -22493 0
 22490  22491 -22492  920 -22494 0
 22490  22491 -22492  920 -22495 0

c  0-1 --> -1
c    (-b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧ -p_920) -> ( b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0)
c  in CNF:
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨  b^{230, 5}_2
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_1
c     b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨  b^{230, 5}_0
c  in DIMACS:
 22490  22491  22492  920  22493 0
 22490  22491  22492  920 -22494 0
 22490  22491  22492  920  22495 0

c  -1-1 --> -2
c    ( b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧  b^{230, 4}_0 ∧ -p_920) -> ( b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0)
c  in CNF:
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨  b^{230, 5}_2
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨  b^{230, 5}_1
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨  p_920 ∨ -b^{230, 5}_0
c  in DIMACS:
-22490  22491 -22492  920  22493 0
-22490  22491 -22492  920  22494 0
-22490  22491 -22492  920 -22495 0

c  -2-1 --> break 
c    ( b^{230, 4}_2 ∧  b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧ -p_920) -> break
c  in CNF:
c    -b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨  b^{230, 4}_0 ∨  p_920 ∨ break
c  in DIMACS:
-22490 -22491  22492  920 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{230, 4}_2 ∧ -b^{230, 4}_1 ∧ -b^{230, 4}_0 ∧ true) 
c  in CNF:
c    -b^{230, 4}_2 ∨  b^{230, 4}_1 ∨  b^{230, 4}_0 ∨ false 
c  in DIMACS:
-22490  22491  22492  0

c  3 does not represent an automaton state.
c    -(-b^{230, 4}_2 ∧  b^{230, 4}_1 ∧  b^{230, 4}_0 ∧ true) 
c  in CNF:
c     b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ false 
c  in DIMACS:
 22490 -22491 -22492  0
c  -3 does not represent an automaton state.
c    -( b^{230, 4}_2 ∧  b^{230, 4}_1 ∧  b^{230, 4}_0 ∧ true) 
c  in CNF:
c    -b^{230, 4}_2 ∨ -b^{230, 4}_1 ∨ -b^{230, 4}_0 ∨ false 
c  in DIMACS:
-22490 -22491 -22492  0

c i = 5
c  -2+1 --> -1
c    ( b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧  p_1150) -> ( b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧  b^{230, 6}_0)
c  in CNF:
c    -b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨  b^{230, 6}_2
c    -b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_1
c    -b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨  b^{230, 6}_0
c  in DIMACS:
-22493 -22494  22495 -1150  22496 0
-22493 -22494  22495 -1150 -22497 0
-22493 -22494  22495 -1150  22498 0

c  -1+1 --> 0
c    ( b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0 ∧  p_1150) -> (-b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧ -b^{230, 6}_0)
c  in CNF:
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_2
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_1
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_0
c  in DIMACS:
-22493  22494 -22495 -1150 -22496 0
-22493  22494 -22495 -1150 -22497 0
-22493  22494 -22495 -1150 -22498 0

c  0+1 --> 1
c    (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧  p_1150) -> (-b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧  b^{230, 6}_0)
c  in CNF:
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_2
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_1
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨  b^{230, 6}_0
c  in DIMACS:
 22493  22494  22495 -1150 -22496 0
 22493  22494  22495 -1150 -22497 0
 22493  22494  22495 -1150  22498 0

c  1+1 --> 2
c    (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0 ∧  p_1150) -> (-b^{230, 6}_2 ∧  b^{230, 6}_1 ∧ -b^{230, 6}_0)
c  in CNF:
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_2
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨  b^{230, 6}_1
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ -p_1150 ∨ -b^{230, 6}_0
c  in DIMACS:
 22493  22494 -22495 -1150 -22496 0
 22493  22494 -22495 -1150  22497 0
 22493  22494 -22495 -1150 -22498 0

c  2+1 --> break 
c    (-b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧  p_1150) -> break
c  in CNF:
c     b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ -p_1150 ∨ break
c  in DIMACS:
 22493 -22494  22495 -1150 1162 0


c  2-1 --> 1
c    (-b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧ -p_1150) -> (-b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧  b^{230, 6}_0)
c  in CNF:
c     b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_2
c     b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_1
c     b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨  b^{230, 6}_0
c  in DIMACS:
 22493 -22494  22495  1150 -22496 0
 22493 -22494  22495  1150 -22497 0
 22493 -22494  22495  1150  22498 0

c  1-1 --> 0
c    (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0 ∧ -p_1150) -> (-b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧ -b^{230, 6}_0)
c  in CNF:
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_2
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_1
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_0
c  in DIMACS:
 22493  22494 -22495  1150 -22496 0
 22493  22494 -22495  1150 -22497 0
 22493  22494 -22495  1150 -22498 0

c  0-1 --> -1
c    (-b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧ -p_1150) -> ( b^{230, 6}_2 ∧ -b^{230, 6}_1 ∧  b^{230, 6}_0)
c  in CNF:
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨  b^{230, 6}_2
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_1
c     b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨  b^{230, 6}_0
c  in DIMACS:
 22493  22494  22495  1150  22496 0
 22493  22494  22495  1150 -22497 0
 22493  22494  22495  1150  22498 0

c  -1-1 --> -2
c    ( b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧  b^{230, 5}_0 ∧ -p_1150) -> ( b^{230, 6}_2 ∧  b^{230, 6}_1 ∧ -b^{230, 6}_0)
c  in CNF:
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨  b^{230, 6}_2
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨  b^{230, 6}_1
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨  p_1150 ∨ -b^{230, 6}_0
c  in DIMACS:
-22493  22494 -22495  1150  22496 0
-22493  22494 -22495  1150  22497 0
-22493  22494 -22495  1150 -22498 0

c  -2-1 --> break 
c    ( b^{230, 5}_2 ∧  b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧ -p_1150) -> break
c  in CNF:
c    -b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨  b^{230, 5}_0 ∨  p_1150 ∨ break
c  in DIMACS:
-22493 -22494  22495  1150 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{230, 5}_2 ∧ -b^{230, 5}_1 ∧ -b^{230, 5}_0 ∧ true) 
c  in CNF:
c    -b^{230, 5}_2 ∨  b^{230, 5}_1 ∨  b^{230, 5}_0 ∨ false 
c  in DIMACS:
-22493  22494  22495  0

c  3 does not represent an automaton state.
c    -(-b^{230, 5}_2 ∧  b^{230, 5}_1 ∧  b^{230, 5}_0 ∧ true) 
c  in CNF:
c     b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ false 
c  in DIMACS:
 22493 -22494 -22495  0
c  -3 does not represent an automaton state.
c    -( b^{230, 5}_2 ∧  b^{230, 5}_1 ∧  b^{230, 5}_0 ∧ true) 
c  in CNF:
c    -b^{230, 5}_2 ∨ -b^{230, 5}_1 ∨ -b^{230, 5}_0 ∨ false 
c  in DIMACS:
-22493 -22494 -22495  0

c INIT for k = 231
c    -b^{231, 1}_2
c    -b^{231, 1}_1
c    -b^{231, 1}_0
c  in DIMACS:
-22499 0
-22500 0
-22501 0

c Transitions for k = 231
c i = 1
c  -2+1 --> -1
c    ( b^{231, 1}_2 ∧  b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧  p_231) -> ( b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0)
c  in CNF:
c    -b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨  b^{231, 2}_2
c    -b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_1
c    -b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨  b^{231, 2}_0
c  in DIMACS:
-22499 -22500  22501 -231  22502 0
-22499 -22500  22501 -231 -22503 0
-22499 -22500  22501 -231  22504 0

c  -1+1 --> 0
c    ( b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧  b^{231, 1}_0 ∧  p_231) -> (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧ -b^{231, 2}_0)
c  in CNF:
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_2
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_1
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_0
c  in DIMACS:
-22499  22500 -22501 -231 -22502 0
-22499  22500 -22501 -231 -22503 0
-22499  22500 -22501 -231 -22504 0

c  0+1 --> 1
c    (-b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧  p_231) -> (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0)
c  in CNF:
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_2
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_1
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨  b^{231, 2}_0
c  in DIMACS:
 22499  22500  22501 -231 -22502 0
 22499  22500  22501 -231 -22503 0
 22499  22500  22501 -231  22504 0

c  1+1 --> 2
c    (-b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧  b^{231, 1}_0 ∧  p_231) -> (-b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0)
c  in CNF:
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_2
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨  b^{231, 2}_1
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ -p_231 ∨ -b^{231, 2}_0
c  in DIMACS:
 22499  22500 -22501 -231 -22502 0
 22499  22500 -22501 -231  22503 0
 22499  22500 -22501 -231 -22504 0

c  2+1 --> break 
c    (-b^{231, 1}_2 ∧  b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧  p_231) -> break
c  in CNF:
c     b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ -p_231 ∨ break
c  in DIMACS:
 22499 -22500  22501 -231 1162 0


c  2-1 --> 1
c    (-b^{231, 1}_2 ∧  b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧ -p_231) -> (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0)
c  in CNF:
c     b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_2
c     b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_1
c     b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨  b^{231, 2}_0
c  in DIMACS:
 22499 -22500  22501  231 -22502 0
 22499 -22500  22501  231 -22503 0
 22499 -22500  22501  231  22504 0

c  1-1 --> 0
c    (-b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧  b^{231, 1}_0 ∧ -p_231) -> (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧ -b^{231, 2}_0)
c  in CNF:
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_2
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_1
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_0
c  in DIMACS:
 22499  22500 -22501  231 -22502 0
 22499  22500 -22501  231 -22503 0
 22499  22500 -22501  231 -22504 0

c  0-1 --> -1
c    (-b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧ -p_231) -> ( b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0)
c  in CNF:
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨  b^{231, 2}_2
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_1
c     b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨  b^{231, 2}_0
c  in DIMACS:
 22499  22500  22501  231  22502 0
 22499  22500  22501  231 -22503 0
 22499  22500  22501  231  22504 0

c  -1-1 --> -2
c    ( b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧  b^{231, 1}_0 ∧ -p_231) -> ( b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0)
c  in CNF:
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨  b^{231, 2}_2
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨  b^{231, 2}_1
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨  p_231 ∨ -b^{231, 2}_0
c  in DIMACS:
-22499  22500 -22501  231  22502 0
-22499  22500 -22501  231  22503 0
-22499  22500 -22501  231 -22504 0

c  -2-1 --> break 
c    ( b^{231, 1}_2 ∧  b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧ -p_231) -> break
c  in CNF:
c    -b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨  b^{231, 1}_0 ∨  p_231 ∨ break
c  in DIMACS:
-22499 -22500  22501  231 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{231, 1}_2 ∧ -b^{231, 1}_1 ∧ -b^{231, 1}_0 ∧ true) 
c  in CNF:
c    -b^{231, 1}_2 ∨  b^{231, 1}_1 ∨  b^{231, 1}_0 ∨ false 
c  in DIMACS:
-22499  22500  22501  0

c  3 does not represent an automaton state.
c    -(-b^{231, 1}_2 ∧  b^{231, 1}_1 ∧  b^{231, 1}_0 ∧ true) 
c  in CNF:
c     b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ false 
c  in DIMACS:
 22499 -22500 -22501  0
c  -3 does not represent an automaton state.
c    -( b^{231, 1}_2 ∧  b^{231, 1}_1 ∧  b^{231, 1}_0 ∧ true) 
c  in CNF:
c    -b^{231, 1}_2 ∨ -b^{231, 1}_1 ∨ -b^{231, 1}_0 ∨ false 
c  in DIMACS:
-22499 -22500 -22501  0

c i = 2
c  -2+1 --> -1
c    ( b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧  p_462) -> ( b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0)
c  in CNF:
c    -b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨  b^{231, 3}_2
c    -b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_1
c    -b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨  b^{231, 3}_0
c  in DIMACS:
-22502 -22503  22504 -462  22505 0
-22502 -22503  22504 -462 -22506 0
-22502 -22503  22504 -462  22507 0

c  -1+1 --> 0
c    ( b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0 ∧  p_462) -> (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧ -b^{231, 3}_0)
c  in CNF:
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_2
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_1
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_0
c  in DIMACS:
-22502  22503 -22504 -462 -22505 0
-22502  22503 -22504 -462 -22506 0
-22502  22503 -22504 -462 -22507 0

c  0+1 --> 1
c    (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧  p_462) -> (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0)
c  in CNF:
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_2
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_1
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨  b^{231, 3}_0
c  in DIMACS:
 22502  22503  22504 -462 -22505 0
 22502  22503  22504 -462 -22506 0
 22502  22503  22504 -462  22507 0

c  1+1 --> 2
c    (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0 ∧  p_462) -> (-b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0)
c  in CNF:
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_2
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨  b^{231, 3}_1
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ -p_462 ∨ -b^{231, 3}_0
c  in DIMACS:
 22502  22503 -22504 -462 -22505 0
 22502  22503 -22504 -462  22506 0
 22502  22503 -22504 -462 -22507 0

c  2+1 --> break 
c    (-b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧  p_462) -> break
c  in CNF:
c     b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ -p_462 ∨ break
c  in DIMACS:
 22502 -22503  22504 -462 1162 0


c  2-1 --> 1
c    (-b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧ -p_462) -> (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0)
c  in CNF:
c     b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_2
c     b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_1
c     b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨  b^{231, 3}_0
c  in DIMACS:
 22502 -22503  22504  462 -22505 0
 22502 -22503  22504  462 -22506 0
 22502 -22503  22504  462  22507 0

c  1-1 --> 0
c    (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0 ∧ -p_462) -> (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧ -b^{231, 3}_0)
c  in CNF:
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_2
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_1
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_0
c  in DIMACS:
 22502  22503 -22504  462 -22505 0
 22502  22503 -22504  462 -22506 0
 22502  22503 -22504  462 -22507 0

c  0-1 --> -1
c    (-b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧ -p_462) -> ( b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0)
c  in CNF:
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨  b^{231, 3}_2
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_1
c     b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨  b^{231, 3}_0
c  in DIMACS:
 22502  22503  22504  462  22505 0
 22502  22503  22504  462 -22506 0
 22502  22503  22504  462  22507 0

c  -1-1 --> -2
c    ( b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧  b^{231, 2}_0 ∧ -p_462) -> ( b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0)
c  in CNF:
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨  b^{231, 3}_2
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨  b^{231, 3}_1
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨  p_462 ∨ -b^{231, 3}_0
c  in DIMACS:
-22502  22503 -22504  462  22505 0
-22502  22503 -22504  462  22506 0
-22502  22503 -22504  462 -22507 0

c  -2-1 --> break 
c    ( b^{231, 2}_2 ∧  b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧ -p_462) -> break
c  in CNF:
c    -b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨  b^{231, 2}_0 ∨  p_462 ∨ break
c  in DIMACS:
-22502 -22503  22504  462 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{231, 2}_2 ∧ -b^{231, 2}_1 ∧ -b^{231, 2}_0 ∧ true) 
c  in CNF:
c    -b^{231, 2}_2 ∨  b^{231, 2}_1 ∨  b^{231, 2}_0 ∨ false 
c  in DIMACS:
-22502  22503  22504  0

c  3 does not represent an automaton state.
c    -(-b^{231, 2}_2 ∧  b^{231, 2}_1 ∧  b^{231, 2}_0 ∧ true) 
c  in CNF:
c     b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ false 
c  in DIMACS:
 22502 -22503 -22504  0
c  -3 does not represent an automaton state.
c    -( b^{231, 2}_2 ∧  b^{231, 2}_1 ∧  b^{231, 2}_0 ∧ true) 
c  in CNF:
c    -b^{231, 2}_2 ∨ -b^{231, 2}_1 ∨ -b^{231, 2}_0 ∨ false 
c  in DIMACS:
-22502 -22503 -22504  0

c i = 3
c  -2+1 --> -1
c    ( b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧  p_693) -> ( b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0)
c  in CNF:
c    -b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨  b^{231, 4}_2
c    -b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_1
c    -b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨  b^{231, 4}_0
c  in DIMACS:
-22505 -22506  22507 -693  22508 0
-22505 -22506  22507 -693 -22509 0
-22505 -22506  22507 -693  22510 0

c  -1+1 --> 0
c    ( b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0 ∧  p_693) -> (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧ -b^{231, 4}_0)
c  in CNF:
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_2
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_1
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_0
c  in DIMACS:
-22505  22506 -22507 -693 -22508 0
-22505  22506 -22507 -693 -22509 0
-22505  22506 -22507 -693 -22510 0

c  0+1 --> 1
c    (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧  p_693) -> (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0)
c  in CNF:
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_2
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_1
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨  b^{231, 4}_0
c  in DIMACS:
 22505  22506  22507 -693 -22508 0
 22505  22506  22507 -693 -22509 0
 22505  22506  22507 -693  22510 0

c  1+1 --> 2
c    (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0 ∧  p_693) -> (-b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0)
c  in CNF:
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_2
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨  b^{231, 4}_1
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ -p_693 ∨ -b^{231, 4}_0
c  in DIMACS:
 22505  22506 -22507 -693 -22508 0
 22505  22506 -22507 -693  22509 0
 22505  22506 -22507 -693 -22510 0

c  2+1 --> break 
c    (-b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧  p_693) -> break
c  in CNF:
c     b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ -p_693 ∨ break
c  in DIMACS:
 22505 -22506  22507 -693 1162 0


c  2-1 --> 1
c    (-b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧ -p_693) -> (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0)
c  in CNF:
c     b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_2
c     b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_1
c     b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨  b^{231, 4}_0
c  in DIMACS:
 22505 -22506  22507  693 -22508 0
 22505 -22506  22507  693 -22509 0
 22505 -22506  22507  693  22510 0

c  1-1 --> 0
c    (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0 ∧ -p_693) -> (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧ -b^{231, 4}_0)
c  in CNF:
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_2
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_1
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_0
c  in DIMACS:
 22505  22506 -22507  693 -22508 0
 22505  22506 -22507  693 -22509 0
 22505  22506 -22507  693 -22510 0

c  0-1 --> -1
c    (-b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧ -p_693) -> ( b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0)
c  in CNF:
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨  b^{231, 4}_2
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_1
c     b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨  b^{231, 4}_0
c  in DIMACS:
 22505  22506  22507  693  22508 0
 22505  22506  22507  693 -22509 0
 22505  22506  22507  693  22510 0

c  -1-1 --> -2
c    ( b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧  b^{231, 3}_0 ∧ -p_693) -> ( b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0)
c  in CNF:
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨  b^{231, 4}_2
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨  b^{231, 4}_1
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨  p_693 ∨ -b^{231, 4}_0
c  in DIMACS:
-22505  22506 -22507  693  22508 0
-22505  22506 -22507  693  22509 0
-22505  22506 -22507  693 -22510 0

c  -2-1 --> break 
c    ( b^{231, 3}_2 ∧  b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧ -p_693) -> break
c  in CNF:
c    -b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨  b^{231, 3}_0 ∨  p_693 ∨ break
c  in DIMACS:
-22505 -22506  22507  693 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{231, 3}_2 ∧ -b^{231, 3}_1 ∧ -b^{231, 3}_0 ∧ true) 
c  in CNF:
c    -b^{231, 3}_2 ∨  b^{231, 3}_1 ∨  b^{231, 3}_0 ∨ false 
c  in DIMACS:
-22505  22506  22507  0

c  3 does not represent an automaton state.
c    -(-b^{231, 3}_2 ∧  b^{231, 3}_1 ∧  b^{231, 3}_0 ∧ true) 
c  in CNF:
c     b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ false 
c  in DIMACS:
 22505 -22506 -22507  0
c  -3 does not represent an automaton state.
c    -( b^{231, 3}_2 ∧  b^{231, 3}_1 ∧  b^{231, 3}_0 ∧ true) 
c  in CNF:
c    -b^{231, 3}_2 ∨ -b^{231, 3}_1 ∨ -b^{231, 3}_0 ∨ false 
c  in DIMACS:
-22505 -22506 -22507  0

c i = 4
c  -2+1 --> -1
c    ( b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧  p_924) -> ( b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0)
c  in CNF:
c    -b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨  b^{231, 5}_2
c    -b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_1
c    -b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨  b^{231, 5}_0
c  in DIMACS:
-22508 -22509  22510 -924  22511 0
-22508 -22509  22510 -924 -22512 0
-22508 -22509  22510 -924  22513 0

c  -1+1 --> 0
c    ( b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0 ∧  p_924) -> (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧ -b^{231, 5}_0)
c  in CNF:
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_2
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_1
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_0
c  in DIMACS:
-22508  22509 -22510 -924 -22511 0
-22508  22509 -22510 -924 -22512 0
-22508  22509 -22510 -924 -22513 0

c  0+1 --> 1
c    (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧  p_924) -> (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0)
c  in CNF:
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_2
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_1
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨  b^{231, 5}_0
c  in DIMACS:
 22508  22509  22510 -924 -22511 0
 22508  22509  22510 -924 -22512 0
 22508  22509  22510 -924  22513 0

c  1+1 --> 2
c    (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0 ∧  p_924) -> (-b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0)
c  in CNF:
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_2
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨  b^{231, 5}_1
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ -p_924 ∨ -b^{231, 5}_0
c  in DIMACS:
 22508  22509 -22510 -924 -22511 0
 22508  22509 -22510 -924  22512 0
 22508  22509 -22510 -924 -22513 0

c  2+1 --> break 
c    (-b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧  p_924) -> break
c  in CNF:
c     b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 22508 -22509  22510 -924 1162 0


c  2-1 --> 1
c    (-b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧ -p_924) -> (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0)
c  in CNF:
c     b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_2
c     b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_1
c     b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨  b^{231, 5}_0
c  in DIMACS:
 22508 -22509  22510  924 -22511 0
 22508 -22509  22510  924 -22512 0
 22508 -22509  22510  924  22513 0

c  1-1 --> 0
c    (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0 ∧ -p_924) -> (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧ -b^{231, 5}_0)
c  in CNF:
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_2
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_1
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_0
c  in DIMACS:
 22508  22509 -22510  924 -22511 0
 22508  22509 -22510  924 -22512 0
 22508  22509 -22510  924 -22513 0

c  0-1 --> -1
c    (-b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧ -p_924) -> ( b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0)
c  in CNF:
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨  b^{231, 5}_2
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_1
c     b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨  b^{231, 5}_0
c  in DIMACS:
 22508  22509  22510  924  22511 0
 22508  22509  22510  924 -22512 0
 22508  22509  22510  924  22513 0

c  -1-1 --> -2
c    ( b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧  b^{231, 4}_0 ∧ -p_924) -> ( b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0)
c  in CNF:
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨  b^{231, 5}_2
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨  b^{231, 5}_1
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨  p_924 ∨ -b^{231, 5}_0
c  in DIMACS:
-22508  22509 -22510  924  22511 0
-22508  22509 -22510  924  22512 0
-22508  22509 -22510  924 -22513 0

c  -2-1 --> break 
c    ( b^{231, 4}_2 ∧  b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨  b^{231, 4}_0 ∨  p_924 ∨ break
c  in DIMACS:
-22508 -22509  22510  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{231, 4}_2 ∧ -b^{231, 4}_1 ∧ -b^{231, 4}_0 ∧ true) 
c  in CNF:
c    -b^{231, 4}_2 ∨  b^{231, 4}_1 ∨  b^{231, 4}_0 ∨ false 
c  in DIMACS:
-22508  22509  22510  0

c  3 does not represent an automaton state.
c    -(-b^{231, 4}_2 ∧  b^{231, 4}_1 ∧  b^{231, 4}_0 ∧ true) 
c  in CNF:
c     b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ false 
c  in DIMACS:
 22508 -22509 -22510  0
c  -3 does not represent an automaton state.
c    -( b^{231, 4}_2 ∧  b^{231, 4}_1 ∧  b^{231, 4}_0 ∧ true) 
c  in CNF:
c    -b^{231, 4}_2 ∨ -b^{231, 4}_1 ∨ -b^{231, 4}_0 ∨ false 
c  in DIMACS:
-22508 -22509 -22510  0

c i = 5
c  -2+1 --> -1
c    ( b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧  p_1155) -> ( b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧  b^{231, 6}_0)
c  in CNF:
c    -b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨  b^{231, 6}_2
c    -b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_1
c    -b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨  b^{231, 6}_0
c  in DIMACS:
-22511 -22512  22513 -1155  22514 0
-22511 -22512  22513 -1155 -22515 0
-22511 -22512  22513 -1155  22516 0

c  -1+1 --> 0
c    ( b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0 ∧  p_1155) -> (-b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧ -b^{231, 6}_0)
c  in CNF:
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_2
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_1
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_0
c  in DIMACS:
-22511  22512 -22513 -1155 -22514 0
-22511  22512 -22513 -1155 -22515 0
-22511  22512 -22513 -1155 -22516 0

c  0+1 --> 1
c    (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧  p_1155) -> (-b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧  b^{231, 6}_0)
c  in CNF:
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_2
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_1
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨  b^{231, 6}_0
c  in DIMACS:
 22511  22512  22513 -1155 -22514 0
 22511  22512  22513 -1155 -22515 0
 22511  22512  22513 -1155  22516 0

c  1+1 --> 2
c    (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0 ∧  p_1155) -> (-b^{231, 6}_2 ∧  b^{231, 6}_1 ∧ -b^{231, 6}_0)
c  in CNF:
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_2
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨  b^{231, 6}_1
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ -p_1155 ∨ -b^{231, 6}_0
c  in DIMACS:
 22511  22512 -22513 -1155 -22514 0
 22511  22512 -22513 -1155  22515 0
 22511  22512 -22513 -1155 -22516 0

c  2+1 --> break 
c    (-b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 22511 -22512  22513 -1155 1162 0


c  2-1 --> 1
c    (-b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧ -p_1155) -> (-b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧  b^{231, 6}_0)
c  in CNF:
c     b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_2
c     b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_1
c     b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨  b^{231, 6}_0
c  in DIMACS:
 22511 -22512  22513  1155 -22514 0
 22511 -22512  22513  1155 -22515 0
 22511 -22512  22513  1155  22516 0

c  1-1 --> 0
c    (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0 ∧ -p_1155) -> (-b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧ -b^{231, 6}_0)
c  in CNF:
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_2
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_1
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_0
c  in DIMACS:
 22511  22512 -22513  1155 -22514 0
 22511  22512 -22513  1155 -22515 0
 22511  22512 -22513  1155 -22516 0

c  0-1 --> -1
c    (-b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧ -p_1155) -> ( b^{231, 6}_2 ∧ -b^{231, 6}_1 ∧  b^{231, 6}_0)
c  in CNF:
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨  b^{231, 6}_2
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_1
c     b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨  b^{231, 6}_0
c  in DIMACS:
 22511  22512  22513  1155  22514 0
 22511  22512  22513  1155 -22515 0
 22511  22512  22513  1155  22516 0

c  -1-1 --> -2
c    ( b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧  b^{231, 5}_0 ∧ -p_1155) -> ( b^{231, 6}_2 ∧  b^{231, 6}_1 ∧ -b^{231, 6}_0)
c  in CNF:
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨  b^{231, 6}_2
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨  b^{231, 6}_1
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨  p_1155 ∨ -b^{231, 6}_0
c  in DIMACS:
-22511  22512 -22513  1155  22514 0
-22511  22512 -22513  1155  22515 0
-22511  22512 -22513  1155 -22516 0

c  -2-1 --> break 
c    ( b^{231, 5}_2 ∧  b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨  b^{231, 5}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-22511 -22512  22513  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{231, 5}_2 ∧ -b^{231, 5}_1 ∧ -b^{231, 5}_0 ∧ true) 
c  in CNF:
c    -b^{231, 5}_2 ∨  b^{231, 5}_1 ∨  b^{231, 5}_0 ∨ false 
c  in DIMACS:
-22511  22512  22513  0

c  3 does not represent an automaton state.
c    -(-b^{231, 5}_2 ∧  b^{231, 5}_1 ∧  b^{231, 5}_0 ∧ true) 
c  in CNF:
c     b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ false 
c  in DIMACS:
 22511 -22512 -22513  0
c  -3 does not represent an automaton state.
c    -( b^{231, 5}_2 ∧  b^{231, 5}_1 ∧  b^{231, 5}_0 ∧ true) 
c  in CNF:
c    -b^{231, 5}_2 ∨ -b^{231, 5}_1 ∨ -b^{231, 5}_0 ∨ false 
c  in DIMACS:
-22511 -22512 -22513  0

c INIT for k = 232
c    -b^{232, 1}_2
c    -b^{232, 1}_1
c    -b^{232, 1}_0
c  in DIMACS:
-22517 0
-22518 0
-22519 0

c Transitions for k = 232
c i = 1
c  -2+1 --> -1
c    ( b^{232, 1}_2 ∧  b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧  p_232) -> ( b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0)
c  in CNF:
c    -b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨  b^{232, 2}_2
c    -b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_1
c    -b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨  b^{232, 2}_0
c  in DIMACS:
-22517 -22518  22519 -232  22520 0
-22517 -22518  22519 -232 -22521 0
-22517 -22518  22519 -232  22522 0

c  -1+1 --> 0
c    ( b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧  b^{232, 1}_0 ∧  p_232) -> (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧ -b^{232, 2}_0)
c  in CNF:
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_2
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_1
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_0
c  in DIMACS:
-22517  22518 -22519 -232 -22520 0
-22517  22518 -22519 -232 -22521 0
-22517  22518 -22519 -232 -22522 0

c  0+1 --> 1
c    (-b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧  p_232) -> (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0)
c  in CNF:
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_2
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_1
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨  b^{232, 2}_0
c  in DIMACS:
 22517  22518  22519 -232 -22520 0
 22517  22518  22519 -232 -22521 0
 22517  22518  22519 -232  22522 0

c  1+1 --> 2
c    (-b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧  b^{232, 1}_0 ∧  p_232) -> (-b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0)
c  in CNF:
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_2
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨  b^{232, 2}_1
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ -p_232 ∨ -b^{232, 2}_0
c  in DIMACS:
 22517  22518 -22519 -232 -22520 0
 22517  22518 -22519 -232  22521 0
 22517  22518 -22519 -232 -22522 0

c  2+1 --> break 
c    (-b^{232, 1}_2 ∧  b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧  p_232) -> break
c  in CNF:
c     b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ -p_232 ∨ break
c  in DIMACS:
 22517 -22518  22519 -232 1162 0


c  2-1 --> 1
c    (-b^{232, 1}_2 ∧  b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧ -p_232) -> (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0)
c  in CNF:
c     b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_2
c     b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_1
c     b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨  b^{232, 2}_0
c  in DIMACS:
 22517 -22518  22519  232 -22520 0
 22517 -22518  22519  232 -22521 0
 22517 -22518  22519  232  22522 0

c  1-1 --> 0
c    (-b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧  b^{232, 1}_0 ∧ -p_232) -> (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧ -b^{232, 2}_0)
c  in CNF:
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_2
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_1
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_0
c  in DIMACS:
 22517  22518 -22519  232 -22520 0
 22517  22518 -22519  232 -22521 0
 22517  22518 -22519  232 -22522 0

c  0-1 --> -1
c    (-b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧ -p_232) -> ( b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0)
c  in CNF:
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨  b^{232, 2}_2
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_1
c     b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨  b^{232, 2}_0
c  in DIMACS:
 22517  22518  22519  232  22520 0
 22517  22518  22519  232 -22521 0
 22517  22518  22519  232  22522 0

c  -1-1 --> -2
c    ( b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧  b^{232, 1}_0 ∧ -p_232) -> ( b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0)
c  in CNF:
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨  b^{232, 2}_2
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨  b^{232, 2}_1
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨  p_232 ∨ -b^{232, 2}_0
c  in DIMACS:
-22517  22518 -22519  232  22520 0
-22517  22518 -22519  232  22521 0
-22517  22518 -22519  232 -22522 0

c  -2-1 --> break 
c    ( b^{232, 1}_2 ∧  b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧ -p_232) -> break
c  in CNF:
c    -b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨  b^{232, 1}_0 ∨  p_232 ∨ break
c  in DIMACS:
-22517 -22518  22519  232 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{232, 1}_2 ∧ -b^{232, 1}_1 ∧ -b^{232, 1}_0 ∧ true) 
c  in CNF:
c    -b^{232, 1}_2 ∨  b^{232, 1}_1 ∨  b^{232, 1}_0 ∨ false 
c  in DIMACS:
-22517  22518  22519  0

c  3 does not represent an automaton state.
c    -(-b^{232, 1}_2 ∧  b^{232, 1}_1 ∧  b^{232, 1}_0 ∧ true) 
c  in CNF:
c     b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ false 
c  in DIMACS:
 22517 -22518 -22519  0
c  -3 does not represent an automaton state.
c    -( b^{232, 1}_2 ∧  b^{232, 1}_1 ∧  b^{232, 1}_0 ∧ true) 
c  in CNF:
c    -b^{232, 1}_2 ∨ -b^{232, 1}_1 ∨ -b^{232, 1}_0 ∨ false 
c  in DIMACS:
-22517 -22518 -22519  0

c i = 2
c  -2+1 --> -1
c    ( b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧  p_464) -> ( b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0)
c  in CNF:
c    -b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨  b^{232, 3}_2
c    -b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_1
c    -b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨  b^{232, 3}_0
c  in DIMACS:
-22520 -22521  22522 -464  22523 0
-22520 -22521  22522 -464 -22524 0
-22520 -22521  22522 -464  22525 0

c  -1+1 --> 0
c    ( b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0 ∧  p_464) -> (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧ -b^{232, 3}_0)
c  in CNF:
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_2
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_1
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_0
c  in DIMACS:
-22520  22521 -22522 -464 -22523 0
-22520  22521 -22522 -464 -22524 0
-22520  22521 -22522 -464 -22525 0

c  0+1 --> 1
c    (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧  p_464) -> (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0)
c  in CNF:
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_2
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_1
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨  b^{232, 3}_0
c  in DIMACS:
 22520  22521  22522 -464 -22523 0
 22520  22521  22522 -464 -22524 0
 22520  22521  22522 -464  22525 0

c  1+1 --> 2
c    (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0 ∧  p_464) -> (-b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0)
c  in CNF:
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_2
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨  b^{232, 3}_1
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ -p_464 ∨ -b^{232, 3}_0
c  in DIMACS:
 22520  22521 -22522 -464 -22523 0
 22520  22521 -22522 -464  22524 0
 22520  22521 -22522 -464 -22525 0

c  2+1 --> break 
c    (-b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧  p_464) -> break
c  in CNF:
c     b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ -p_464 ∨ break
c  in DIMACS:
 22520 -22521  22522 -464 1162 0


c  2-1 --> 1
c    (-b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧ -p_464) -> (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0)
c  in CNF:
c     b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_2
c     b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_1
c     b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨  b^{232, 3}_0
c  in DIMACS:
 22520 -22521  22522  464 -22523 0
 22520 -22521  22522  464 -22524 0
 22520 -22521  22522  464  22525 0

c  1-1 --> 0
c    (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0 ∧ -p_464) -> (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧ -b^{232, 3}_0)
c  in CNF:
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_2
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_1
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_0
c  in DIMACS:
 22520  22521 -22522  464 -22523 0
 22520  22521 -22522  464 -22524 0
 22520  22521 -22522  464 -22525 0

c  0-1 --> -1
c    (-b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧ -p_464) -> ( b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0)
c  in CNF:
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨  b^{232, 3}_2
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_1
c     b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨  b^{232, 3}_0
c  in DIMACS:
 22520  22521  22522  464  22523 0
 22520  22521  22522  464 -22524 0
 22520  22521  22522  464  22525 0

c  -1-1 --> -2
c    ( b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧  b^{232, 2}_0 ∧ -p_464) -> ( b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0)
c  in CNF:
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨  b^{232, 3}_2
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨  b^{232, 3}_1
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨  p_464 ∨ -b^{232, 3}_0
c  in DIMACS:
-22520  22521 -22522  464  22523 0
-22520  22521 -22522  464  22524 0
-22520  22521 -22522  464 -22525 0

c  -2-1 --> break 
c    ( b^{232, 2}_2 ∧  b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧ -p_464) -> break
c  in CNF:
c    -b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨  b^{232, 2}_0 ∨  p_464 ∨ break
c  in DIMACS:
-22520 -22521  22522  464 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{232, 2}_2 ∧ -b^{232, 2}_1 ∧ -b^{232, 2}_0 ∧ true) 
c  in CNF:
c    -b^{232, 2}_2 ∨  b^{232, 2}_1 ∨  b^{232, 2}_0 ∨ false 
c  in DIMACS:
-22520  22521  22522  0

c  3 does not represent an automaton state.
c    -(-b^{232, 2}_2 ∧  b^{232, 2}_1 ∧  b^{232, 2}_0 ∧ true) 
c  in CNF:
c     b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ false 
c  in DIMACS:
 22520 -22521 -22522  0
c  -3 does not represent an automaton state.
c    -( b^{232, 2}_2 ∧  b^{232, 2}_1 ∧  b^{232, 2}_0 ∧ true) 
c  in CNF:
c    -b^{232, 2}_2 ∨ -b^{232, 2}_1 ∨ -b^{232, 2}_0 ∨ false 
c  in DIMACS:
-22520 -22521 -22522  0

c i = 3
c  -2+1 --> -1
c    ( b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧  p_696) -> ( b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0)
c  in CNF:
c    -b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨  b^{232, 4}_2
c    -b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_1
c    -b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨  b^{232, 4}_0
c  in DIMACS:
-22523 -22524  22525 -696  22526 0
-22523 -22524  22525 -696 -22527 0
-22523 -22524  22525 -696  22528 0

c  -1+1 --> 0
c    ( b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0 ∧  p_696) -> (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧ -b^{232, 4}_0)
c  in CNF:
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_2
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_1
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_0
c  in DIMACS:
-22523  22524 -22525 -696 -22526 0
-22523  22524 -22525 -696 -22527 0
-22523  22524 -22525 -696 -22528 0

c  0+1 --> 1
c    (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧  p_696) -> (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0)
c  in CNF:
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_2
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_1
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨  b^{232, 4}_0
c  in DIMACS:
 22523  22524  22525 -696 -22526 0
 22523  22524  22525 -696 -22527 0
 22523  22524  22525 -696  22528 0

c  1+1 --> 2
c    (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0 ∧  p_696) -> (-b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0)
c  in CNF:
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_2
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨  b^{232, 4}_1
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ -p_696 ∨ -b^{232, 4}_0
c  in DIMACS:
 22523  22524 -22525 -696 -22526 0
 22523  22524 -22525 -696  22527 0
 22523  22524 -22525 -696 -22528 0

c  2+1 --> break 
c    (-b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧  p_696) -> break
c  in CNF:
c     b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 22523 -22524  22525 -696 1162 0


c  2-1 --> 1
c    (-b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧ -p_696) -> (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0)
c  in CNF:
c     b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_2
c     b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_1
c     b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨  b^{232, 4}_0
c  in DIMACS:
 22523 -22524  22525  696 -22526 0
 22523 -22524  22525  696 -22527 0
 22523 -22524  22525  696  22528 0

c  1-1 --> 0
c    (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0 ∧ -p_696) -> (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧ -b^{232, 4}_0)
c  in CNF:
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_2
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_1
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_0
c  in DIMACS:
 22523  22524 -22525  696 -22526 0
 22523  22524 -22525  696 -22527 0
 22523  22524 -22525  696 -22528 0

c  0-1 --> -1
c    (-b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧ -p_696) -> ( b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0)
c  in CNF:
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨  b^{232, 4}_2
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_1
c     b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨  b^{232, 4}_0
c  in DIMACS:
 22523  22524  22525  696  22526 0
 22523  22524  22525  696 -22527 0
 22523  22524  22525  696  22528 0

c  -1-1 --> -2
c    ( b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧  b^{232, 3}_0 ∧ -p_696) -> ( b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0)
c  in CNF:
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨  b^{232, 4}_2
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨  b^{232, 4}_1
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨  p_696 ∨ -b^{232, 4}_0
c  in DIMACS:
-22523  22524 -22525  696  22526 0
-22523  22524 -22525  696  22527 0
-22523  22524 -22525  696 -22528 0

c  -2-1 --> break 
c    ( b^{232, 3}_2 ∧  b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨  b^{232, 3}_0 ∨  p_696 ∨ break
c  in DIMACS:
-22523 -22524  22525  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{232, 3}_2 ∧ -b^{232, 3}_1 ∧ -b^{232, 3}_0 ∧ true) 
c  in CNF:
c    -b^{232, 3}_2 ∨  b^{232, 3}_1 ∨  b^{232, 3}_0 ∨ false 
c  in DIMACS:
-22523  22524  22525  0

c  3 does not represent an automaton state.
c    -(-b^{232, 3}_2 ∧  b^{232, 3}_1 ∧  b^{232, 3}_0 ∧ true) 
c  in CNF:
c     b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ false 
c  in DIMACS:
 22523 -22524 -22525  0
c  -3 does not represent an automaton state.
c    -( b^{232, 3}_2 ∧  b^{232, 3}_1 ∧  b^{232, 3}_0 ∧ true) 
c  in CNF:
c    -b^{232, 3}_2 ∨ -b^{232, 3}_1 ∨ -b^{232, 3}_0 ∨ false 
c  in DIMACS:
-22523 -22524 -22525  0

c i = 4
c  -2+1 --> -1
c    ( b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧  p_928) -> ( b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0)
c  in CNF:
c    -b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨  b^{232, 5}_2
c    -b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_1
c    -b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨  b^{232, 5}_0
c  in DIMACS:
-22526 -22527  22528 -928  22529 0
-22526 -22527  22528 -928 -22530 0
-22526 -22527  22528 -928  22531 0

c  -1+1 --> 0
c    ( b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0 ∧  p_928) -> (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧ -b^{232, 5}_0)
c  in CNF:
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_2
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_1
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_0
c  in DIMACS:
-22526  22527 -22528 -928 -22529 0
-22526  22527 -22528 -928 -22530 0
-22526  22527 -22528 -928 -22531 0

c  0+1 --> 1
c    (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧  p_928) -> (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0)
c  in CNF:
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_2
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_1
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨  b^{232, 5}_0
c  in DIMACS:
 22526  22527  22528 -928 -22529 0
 22526  22527  22528 -928 -22530 0
 22526  22527  22528 -928  22531 0

c  1+1 --> 2
c    (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0 ∧  p_928) -> (-b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0)
c  in CNF:
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_2
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨  b^{232, 5}_1
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ -p_928 ∨ -b^{232, 5}_0
c  in DIMACS:
 22526  22527 -22528 -928 -22529 0
 22526  22527 -22528 -928  22530 0
 22526  22527 -22528 -928 -22531 0

c  2+1 --> break 
c    (-b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧  p_928) -> break
c  in CNF:
c     b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ -p_928 ∨ break
c  in DIMACS:
 22526 -22527  22528 -928 1162 0


c  2-1 --> 1
c    (-b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧ -p_928) -> (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0)
c  in CNF:
c     b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_2
c     b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_1
c     b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨  b^{232, 5}_0
c  in DIMACS:
 22526 -22527  22528  928 -22529 0
 22526 -22527  22528  928 -22530 0
 22526 -22527  22528  928  22531 0

c  1-1 --> 0
c    (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0 ∧ -p_928) -> (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧ -b^{232, 5}_0)
c  in CNF:
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_2
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_1
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_0
c  in DIMACS:
 22526  22527 -22528  928 -22529 0
 22526  22527 -22528  928 -22530 0
 22526  22527 -22528  928 -22531 0

c  0-1 --> -1
c    (-b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧ -p_928) -> ( b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0)
c  in CNF:
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨  b^{232, 5}_2
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_1
c     b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨  b^{232, 5}_0
c  in DIMACS:
 22526  22527  22528  928  22529 0
 22526  22527  22528  928 -22530 0
 22526  22527  22528  928  22531 0

c  -1-1 --> -2
c    ( b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧  b^{232, 4}_0 ∧ -p_928) -> ( b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0)
c  in CNF:
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨  b^{232, 5}_2
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨  b^{232, 5}_1
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨  p_928 ∨ -b^{232, 5}_0
c  in DIMACS:
-22526  22527 -22528  928  22529 0
-22526  22527 -22528  928  22530 0
-22526  22527 -22528  928 -22531 0

c  -2-1 --> break 
c    ( b^{232, 4}_2 ∧  b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧ -p_928) -> break
c  in CNF:
c    -b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨  b^{232, 4}_0 ∨  p_928 ∨ break
c  in DIMACS:
-22526 -22527  22528  928 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{232, 4}_2 ∧ -b^{232, 4}_1 ∧ -b^{232, 4}_0 ∧ true) 
c  in CNF:
c    -b^{232, 4}_2 ∨  b^{232, 4}_1 ∨  b^{232, 4}_0 ∨ false 
c  in DIMACS:
-22526  22527  22528  0

c  3 does not represent an automaton state.
c    -(-b^{232, 4}_2 ∧  b^{232, 4}_1 ∧  b^{232, 4}_0 ∧ true) 
c  in CNF:
c     b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ false 
c  in DIMACS:
 22526 -22527 -22528  0
c  -3 does not represent an automaton state.
c    -( b^{232, 4}_2 ∧  b^{232, 4}_1 ∧  b^{232, 4}_0 ∧ true) 
c  in CNF:
c    -b^{232, 4}_2 ∨ -b^{232, 4}_1 ∨ -b^{232, 4}_0 ∨ false 
c  in DIMACS:
-22526 -22527 -22528  0

c i = 5
c  -2+1 --> -1
c    ( b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧  p_1160) -> ( b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧  b^{232, 6}_0)
c  in CNF:
c    -b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨  b^{232, 6}_2
c    -b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_1
c    -b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨  b^{232, 6}_0
c  in DIMACS:
-22529 -22530  22531 -1160  22532 0
-22529 -22530  22531 -1160 -22533 0
-22529 -22530  22531 -1160  22534 0

c  -1+1 --> 0
c    ( b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0 ∧  p_1160) -> (-b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧ -b^{232, 6}_0)
c  in CNF:
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_2
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_1
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_0
c  in DIMACS:
-22529  22530 -22531 -1160 -22532 0
-22529  22530 -22531 -1160 -22533 0
-22529  22530 -22531 -1160 -22534 0

c  0+1 --> 1
c    (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧  p_1160) -> (-b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧  b^{232, 6}_0)
c  in CNF:
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_2
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_1
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨  b^{232, 6}_0
c  in DIMACS:
 22529  22530  22531 -1160 -22532 0
 22529  22530  22531 -1160 -22533 0
 22529  22530  22531 -1160  22534 0

c  1+1 --> 2
c    (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0 ∧  p_1160) -> (-b^{232, 6}_2 ∧  b^{232, 6}_1 ∧ -b^{232, 6}_0)
c  in CNF:
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_2
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨  b^{232, 6}_1
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ -p_1160 ∨ -b^{232, 6}_0
c  in DIMACS:
 22529  22530 -22531 -1160 -22532 0
 22529  22530 -22531 -1160  22533 0
 22529  22530 -22531 -1160 -22534 0

c  2+1 --> break 
c    (-b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 22529 -22530  22531 -1160 1162 0


c  2-1 --> 1
c    (-b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧ -p_1160) -> (-b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧  b^{232, 6}_0)
c  in CNF:
c     b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_2
c     b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_1
c     b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨  b^{232, 6}_0
c  in DIMACS:
 22529 -22530  22531  1160 -22532 0
 22529 -22530  22531  1160 -22533 0
 22529 -22530  22531  1160  22534 0

c  1-1 --> 0
c    (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0 ∧ -p_1160) -> (-b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧ -b^{232, 6}_0)
c  in CNF:
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_2
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_1
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_0
c  in DIMACS:
 22529  22530 -22531  1160 -22532 0
 22529  22530 -22531  1160 -22533 0
 22529  22530 -22531  1160 -22534 0

c  0-1 --> -1
c    (-b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧ -p_1160) -> ( b^{232, 6}_2 ∧ -b^{232, 6}_1 ∧  b^{232, 6}_0)
c  in CNF:
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨  b^{232, 6}_2
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_1
c     b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨  b^{232, 6}_0
c  in DIMACS:
 22529  22530  22531  1160  22532 0
 22529  22530  22531  1160 -22533 0
 22529  22530  22531  1160  22534 0

c  -1-1 --> -2
c    ( b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧  b^{232, 5}_0 ∧ -p_1160) -> ( b^{232, 6}_2 ∧  b^{232, 6}_1 ∧ -b^{232, 6}_0)
c  in CNF:
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨  b^{232, 6}_2
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨  b^{232, 6}_1
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨  p_1160 ∨ -b^{232, 6}_0
c  in DIMACS:
-22529  22530 -22531  1160  22532 0
-22529  22530 -22531  1160  22533 0
-22529  22530 -22531  1160 -22534 0

c  -2-1 --> break 
c    ( b^{232, 5}_2 ∧  b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨  b^{232, 5}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-22529 -22530  22531  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{232, 5}_2 ∧ -b^{232, 5}_1 ∧ -b^{232, 5}_0 ∧ true) 
c  in CNF:
c    -b^{232, 5}_2 ∨  b^{232, 5}_1 ∨  b^{232, 5}_0 ∨ false 
c  in DIMACS:
-22529  22530  22531  0

c  3 does not represent an automaton state.
c    -(-b^{232, 5}_2 ∧  b^{232, 5}_1 ∧  b^{232, 5}_0 ∧ true) 
c  in CNF:
c     b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ false 
c  in DIMACS:
 22529 -22530 -22531  0
c  -3 does not represent an automaton state.
c    -( b^{232, 5}_2 ∧  b^{232, 5}_1 ∧  b^{232, 5}_0 ∧ true) 
c  in CNF:
c    -b^{232, 5}_2 ∨ -b^{232, 5}_1 ∨ -b^{232, 5}_0 ∨ false 
c  in DIMACS:
-22529 -22530 -22531  0

c INIT for k = 233
c    -b^{233, 1}_2
c    -b^{233, 1}_1
c    -b^{233, 1}_0
c  in DIMACS:
-22535 0
-22536 0
-22537 0

c Transitions for k = 233
c i = 1
c  -2+1 --> -1
c    ( b^{233, 1}_2 ∧  b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧  p_233) -> ( b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0)
c  in CNF:
c    -b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨  b^{233, 2}_2
c    -b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_1
c    -b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨  b^{233, 2}_0
c  in DIMACS:
-22535 -22536  22537 -233  22538 0
-22535 -22536  22537 -233 -22539 0
-22535 -22536  22537 -233  22540 0

c  -1+1 --> 0
c    ( b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧  b^{233, 1}_0 ∧  p_233) -> (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧ -b^{233, 2}_0)
c  in CNF:
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_2
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_1
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_0
c  in DIMACS:
-22535  22536 -22537 -233 -22538 0
-22535  22536 -22537 -233 -22539 0
-22535  22536 -22537 -233 -22540 0

c  0+1 --> 1
c    (-b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧  p_233) -> (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0)
c  in CNF:
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_2
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_1
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨  b^{233, 2}_0
c  in DIMACS:
 22535  22536  22537 -233 -22538 0
 22535  22536  22537 -233 -22539 0
 22535  22536  22537 -233  22540 0

c  1+1 --> 2
c    (-b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧  b^{233, 1}_0 ∧  p_233) -> (-b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0)
c  in CNF:
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_2
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨  b^{233, 2}_1
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ -p_233 ∨ -b^{233, 2}_0
c  in DIMACS:
 22535  22536 -22537 -233 -22538 0
 22535  22536 -22537 -233  22539 0
 22535  22536 -22537 -233 -22540 0

c  2+1 --> break 
c    (-b^{233, 1}_2 ∧  b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧  p_233) -> break
c  in CNF:
c     b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ -p_233 ∨ break
c  in DIMACS:
 22535 -22536  22537 -233 1162 0


c  2-1 --> 1
c    (-b^{233, 1}_2 ∧  b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧ -p_233) -> (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0)
c  in CNF:
c     b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_2
c     b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_1
c     b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨  b^{233, 2}_0
c  in DIMACS:
 22535 -22536  22537  233 -22538 0
 22535 -22536  22537  233 -22539 0
 22535 -22536  22537  233  22540 0

c  1-1 --> 0
c    (-b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧  b^{233, 1}_0 ∧ -p_233) -> (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧ -b^{233, 2}_0)
c  in CNF:
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_2
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_1
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_0
c  in DIMACS:
 22535  22536 -22537  233 -22538 0
 22535  22536 -22537  233 -22539 0
 22535  22536 -22537  233 -22540 0

c  0-1 --> -1
c    (-b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧ -p_233) -> ( b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0)
c  in CNF:
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨  b^{233, 2}_2
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_1
c     b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨  b^{233, 2}_0
c  in DIMACS:
 22535  22536  22537  233  22538 0
 22535  22536  22537  233 -22539 0
 22535  22536  22537  233  22540 0

c  -1-1 --> -2
c    ( b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧  b^{233, 1}_0 ∧ -p_233) -> ( b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0)
c  in CNF:
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨  b^{233, 2}_2
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨  b^{233, 2}_1
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨  p_233 ∨ -b^{233, 2}_0
c  in DIMACS:
-22535  22536 -22537  233  22538 0
-22535  22536 -22537  233  22539 0
-22535  22536 -22537  233 -22540 0

c  -2-1 --> break 
c    ( b^{233, 1}_2 ∧  b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧ -p_233) -> break
c  in CNF:
c    -b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨  b^{233, 1}_0 ∨  p_233 ∨ break
c  in DIMACS:
-22535 -22536  22537  233 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{233, 1}_2 ∧ -b^{233, 1}_1 ∧ -b^{233, 1}_0 ∧ true) 
c  in CNF:
c    -b^{233, 1}_2 ∨  b^{233, 1}_1 ∨  b^{233, 1}_0 ∨ false 
c  in DIMACS:
-22535  22536  22537  0

c  3 does not represent an automaton state.
c    -(-b^{233, 1}_2 ∧  b^{233, 1}_1 ∧  b^{233, 1}_0 ∧ true) 
c  in CNF:
c     b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ false 
c  in DIMACS:
 22535 -22536 -22537  0
c  -3 does not represent an automaton state.
c    -( b^{233, 1}_2 ∧  b^{233, 1}_1 ∧  b^{233, 1}_0 ∧ true) 
c  in CNF:
c    -b^{233, 1}_2 ∨ -b^{233, 1}_1 ∨ -b^{233, 1}_0 ∨ false 
c  in DIMACS:
-22535 -22536 -22537  0

c i = 2
c  -2+1 --> -1
c    ( b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧  p_466) -> ( b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0)
c  in CNF:
c    -b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨  b^{233, 3}_2
c    -b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_1
c    -b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨  b^{233, 3}_0
c  in DIMACS:
-22538 -22539  22540 -466  22541 0
-22538 -22539  22540 -466 -22542 0
-22538 -22539  22540 -466  22543 0

c  -1+1 --> 0
c    ( b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0 ∧  p_466) -> (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧ -b^{233, 3}_0)
c  in CNF:
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_2
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_1
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_0
c  in DIMACS:
-22538  22539 -22540 -466 -22541 0
-22538  22539 -22540 -466 -22542 0
-22538  22539 -22540 -466 -22543 0

c  0+1 --> 1
c    (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧  p_466) -> (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0)
c  in CNF:
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_2
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_1
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨  b^{233, 3}_0
c  in DIMACS:
 22538  22539  22540 -466 -22541 0
 22538  22539  22540 -466 -22542 0
 22538  22539  22540 -466  22543 0

c  1+1 --> 2
c    (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0 ∧  p_466) -> (-b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0)
c  in CNF:
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_2
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨  b^{233, 3}_1
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ -p_466 ∨ -b^{233, 3}_0
c  in DIMACS:
 22538  22539 -22540 -466 -22541 0
 22538  22539 -22540 -466  22542 0
 22538  22539 -22540 -466 -22543 0

c  2+1 --> break 
c    (-b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧  p_466) -> break
c  in CNF:
c     b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ -p_466 ∨ break
c  in DIMACS:
 22538 -22539  22540 -466 1162 0


c  2-1 --> 1
c    (-b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧ -p_466) -> (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0)
c  in CNF:
c     b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_2
c     b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_1
c     b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨  b^{233, 3}_0
c  in DIMACS:
 22538 -22539  22540  466 -22541 0
 22538 -22539  22540  466 -22542 0
 22538 -22539  22540  466  22543 0

c  1-1 --> 0
c    (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0 ∧ -p_466) -> (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧ -b^{233, 3}_0)
c  in CNF:
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_2
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_1
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_0
c  in DIMACS:
 22538  22539 -22540  466 -22541 0
 22538  22539 -22540  466 -22542 0
 22538  22539 -22540  466 -22543 0

c  0-1 --> -1
c    (-b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧ -p_466) -> ( b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0)
c  in CNF:
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨  b^{233, 3}_2
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_1
c     b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨  b^{233, 3}_0
c  in DIMACS:
 22538  22539  22540  466  22541 0
 22538  22539  22540  466 -22542 0
 22538  22539  22540  466  22543 0

c  -1-1 --> -2
c    ( b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧  b^{233, 2}_0 ∧ -p_466) -> ( b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0)
c  in CNF:
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨  b^{233, 3}_2
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨  b^{233, 3}_1
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨  p_466 ∨ -b^{233, 3}_0
c  in DIMACS:
-22538  22539 -22540  466  22541 0
-22538  22539 -22540  466  22542 0
-22538  22539 -22540  466 -22543 0

c  -2-1 --> break 
c    ( b^{233, 2}_2 ∧  b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧ -p_466) -> break
c  in CNF:
c    -b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨  b^{233, 2}_0 ∨  p_466 ∨ break
c  in DIMACS:
-22538 -22539  22540  466 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{233, 2}_2 ∧ -b^{233, 2}_1 ∧ -b^{233, 2}_0 ∧ true) 
c  in CNF:
c    -b^{233, 2}_2 ∨  b^{233, 2}_1 ∨  b^{233, 2}_0 ∨ false 
c  in DIMACS:
-22538  22539  22540  0

c  3 does not represent an automaton state.
c    -(-b^{233, 2}_2 ∧  b^{233, 2}_1 ∧  b^{233, 2}_0 ∧ true) 
c  in CNF:
c     b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ false 
c  in DIMACS:
 22538 -22539 -22540  0
c  -3 does not represent an automaton state.
c    -( b^{233, 2}_2 ∧  b^{233, 2}_1 ∧  b^{233, 2}_0 ∧ true) 
c  in CNF:
c    -b^{233, 2}_2 ∨ -b^{233, 2}_1 ∨ -b^{233, 2}_0 ∨ false 
c  in DIMACS:
-22538 -22539 -22540  0

c i = 3
c  -2+1 --> -1
c    ( b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧  p_699) -> ( b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0)
c  in CNF:
c    -b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨  b^{233, 4}_2
c    -b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_1
c    -b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨  b^{233, 4}_0
c  in DIMACS:
-22541 -22542  22543 -699  22544 0
-22541 -22542  22543 -699 -22545 0
-22541 -22542  22543 -699  22546 0

c  -1+1 --> 0
c    ( b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0 ∧  p_699) -> (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧ -b^{233, 4}_0)
c  in CNF:
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_2
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_1
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_0
c  in DIMACS:
-22541  22542 -22543 -699 -22544 0
-22541  22542 -22543 -699 -22545 0
-22541  22542 -22543 -699 -22546 0

c  0+1 --> 1
c    (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧  p_699) -> (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0)
c  in CNF:
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_2
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_1
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨  b^{233, 4}_0
c  in DIMACS:
 22541  22542  22543 -699 -22544 0
 22541  22542  22543 -699 -22545 0
 22541  22542  22543 -699  22546 0

c  1+1 --> 2
c    (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0 ∧  p_699) -> (-b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0)
c  in CNF:
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_2
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨  b^{233, 4}_1
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ -p_699 ∨ -b^{233, 4}_0
c  in DIMACS:
 22541  22542 -22543 -699 -22544 0
 22541  22542 -22543 -699  22545 0
 22541  22542 -22543 -699 -22546 0

c  2+1 --> break 
c    (-b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧  p_699) -> break
c  in CNF:
c     b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ -p_699 ∨ break
c  in DIMACS:
 22541 -22542  22543 -699 1162 0


c  2-1 --> 1
c    (-b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧ -p_699) -> (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0)
c  in CNF:
c     b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_2
c     b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_1
c     b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨  b^{233, 4}_0
c  in DIMACS:
 22541 -22542  22543  699 -22544 0
 22541 -22542  22543  699 -22545 0
 22541 -22542  22543  699  22546 0

c  1-1 --> 0
c    (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0 ∧ -p_699) -> (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧ -b^{233, 4}_0)
c  in CNF:
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_2
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_1
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_0
c  in DIMACS:
 22541  22542 -22543  699 -22544 0
 22541  22542 -22543  699 -22545 0
 22541  22542 -22543  699 -22546 0

c  0-1 --> -1
c    (-b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧ -p_699) -> ( b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0)
c  in CNF:
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨  b^{233, 4}_2
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_1
c     b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨  b^{233, 4}_0
c  in DIMACS:
 22541  22542  22543  699  22544 0
 22541  22542  22543  699 -22545 0
 22541  22542  22543  699  22546 0

c  -1-1 --> -2
c    ( b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧  b^{233, 3}_0 ∧ -p_699) -> ( b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0)
c  in CNF:
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨  b^{233, 4}_2
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨  b^{233, 4}_1
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨  p_699 ∨ -b^{233, 4}_0
c  in DIMACS:
-22541  22542 -22543  699  22544 0
-22541  22542 -22543  699  22545 0
-22541  22542 -22543  699 -22546 0

c  -2-1 --> break 
c    ( b^{233, 3}_2 ∧  b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧ -p_699) -> break
c  in CNF:
c    -b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨  b^{233, 3}_0 ∨  p_699 ∨ break
c  in DIMACS:
-22541 -22542  22543  699 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{233, 3}_2 ∧ -b^{233, 3}_1 ∧ -b^{233, 3}_0 ∧ true) 
c  in CNF:
c    -b^{233, 3}_2 ∨  b^{233, 3}_1 ∨  b^{233, 3}_0 ∨ false 
c  in DIMACS:
-22541  22542  22543  0

c  3 does not represent an automaton state.
c    -(-b^{233, 3}_2 ∧  b^{233, 3}_1 ∧  b^{233, 3}_0 ∧ true) 
c  in CNF:
c     b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ false 
c  in DIMACS:
 22541 -22542 -22543  0
c  -3 does not represent an automaton state.
c    -( b^{233, 3}_2 ∧  b^{233, 3}_1 ∧  b^{233, 3}_0 ∧ true) 
c  in CNF:
c    -b^{233, 3}_2 ∨ -b^{233, 3}_1 ∨ -b^{233, 3}_0 ∨ false 
c  in DIMACS:
-22541 -22542 -22543  0

c i = 4
c  -2+1 --> -1
c    ( b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧  p_932) -> ( b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧  b^{233, 5}_0)
c  in CNF:
c    -b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨  b^{233, 5}_2
c    -b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_1
c    -b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨  b^{233, 5}_0
c  in DIMACS:
-22544 -22545  22546 -932  22547 0
-22544 -22545  22546 -932 -22548 0
-22544 -22545  22546 -932  22549 0

c  -1+1 --> 0
c    ( b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0 ∧  p_932) -> (-b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧ -b^{233, 5}_0)
c  in CNF:
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_2
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_1
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_0
c  in DIMACS:
-22544  22545 -22546 -932 -22547 0
-22544  22545 -22546 -932 -22548 0
-22544  22545 -22546 -932 -22549 0

c  0+1 --> 1
c    (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧  p_932) -> (-b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧  b^{233, 5}_0)
c  in CNF:
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_2
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_1
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨  b^{233, 5}_0
c  in DIMACS:
 22544  22545  22546 -932 -22547 0
 22544  22545  22546 -932 -22548 0
 22544  22545  22546 -932  22549 0

c  1+1 --> 2
c    (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0 ∧  p_932) -> (-b^{233, 5}_2 ∧  b^{233, 5}_1 ∧ -b^{233, 5}_0)
c  in CNF:
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_2
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨  b^{233, 5}_1
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ -p_932 ∨ -b^{233, 5}_0
c  in DIMACS:
 22544  22545 -22546 -932 -22547 0
 22544  22545 -22546 -932  22548 0
 22544  22545 -22546 -932 -22549 0

c  2+1 --> break 
c    (-b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧  p_932) -> break
c  in CNF:
c     b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ -p_932 ∨ break
c  in DIMACS:
 22544 -22545  22546 -932 1162 0


c  2-1 --> 1
c    (-b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧ -p_932) -> (-b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧  b^{233, 5}_0)
c  in CNF:
c     b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_2
c     b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_1
c     b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨  b^{233, 5}_0
c  in DIMACS:
 22544 -22545  22546  932 -22547 0
 22544 -22545  22546  932 -22548 0
 22544 -22545  22546  932  22549 0

c  1-1 --> 0
c    (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0 ∧ -p_932) -> (-b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧ -b^{233, 5}_0)
c  in CNF:
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_2
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_1
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_0
c  in DIMACS:
 22544  22545 -22546  932 -22547 0
 22544  22545 -22546  932 -22548 0
 22544  22545 -22546  932 -22549 0

c  0-1 --> -1
c    (-b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧ -p_932) -> ( b^{233, 5}_2 ∧ -b^{233, 5}_1 ∧  b^{233, 5}_0)
c  in CNF:
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨  b^{233, 5}_2
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_1
c     b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨  b^{233, 5}_0
c  in DIMACS:
 22544  22545  22546  932  22547 0
 22544  22545  22546  932 -22548 0
 22544  22545  22546  932  22549 0

c  -1-1 --> -2
c    ( b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧  b^{233, 4}_0 ∧ -p_932) -> ( b^{233, 5}_2 ∧  b^{233, 5}_1 ∧ -b^{233, 5}_0)
c  in CNF:
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨  b^{233, 5}_2
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨  b^{233, 5}_1
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨  p_932 ∨ -b^{233, 5}_0
c  in DIMACS:
-22544  22545 -22546  932  22547 0
-22544  22545 -22546  932  22548 0
-22544  22545 -22546  932 -22549 0

c  -2-1 --> break 
c    ( b^{233, 4}_2 ∧  b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧ -p_932) -> break
c  in CNF:
c    -b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨  b^{233, 4}_0 ∨  p_932 ∨ break
c  in DIMACS:
-22544 -22545  22546  932 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{233, 4}_2 ∧ -b^{233, 4}_1 ∧ -b^{233, 4}_0 ∧ true) 
c  in CNF:
c    -b^{233, 4}_2 ∨  b^{233, 4}_1 ∨  b^{233, 4}_0 ∨ false 
c  in DIMACS:
-22544  22545  22546  0

c  3 does not represent an automaton state.
c    -(-b^{233, 4}_2 ∧  b^{233, 4}_1 ∧  b^{233, 4}_0 ∧ true) 
c  in CNF:
c     b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ false 
c  in DIMACS:
 22544 -22545 -22546  0
c  -3 does not represent an automaton state.
c    -( b^{233, 4}_2 ∧  b^{233, 4}_1 ∧  b^{233, 4}_0 ∧ true) 
c  in CNF:
c    -b^{233, 4}_2 ∨ -b^{233, 4}_1 ∨ -b^{233, 4}_0 ∨ false 
c  in DIMACS:
-22544 -22545 -22546  0

c INIT for k = 234
c    -b^{234, 1}_2
c    -b^{234, 1}_1
c    -b^{234, 1}_0
c  in DIMACS:
-22550 0
-22551 0
-22552 0

c Transitions for k = 234
c i = 1
c  -2+1 --> -1
c    ( b^{234, 1}_2 ∧  b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧  p_234) -> ( b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0)
c  in CNF:
c    -b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨  b^{234, 2}_2
c    -b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_1
c    -b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨  b^{234, 2}_0
c  in DIMACS:
-22550 -22551  22552 -234  22553 0
-22550 -22551  22552 -234 -22554 0
-22550 -22551  22552 -234  22555 0

c  -1+1 --> 0
c    ( b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧  b^{234, 1}_0 ∧  p_234) -> (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧ -b^{234, 2}_0)
c  in CNF:
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_2
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_1
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_0
c  in DIMACS:
-22550  22551 -22552 -234 -22553 0
-22550  22551 -22552 -234 -22554 0
-22550  22551 -22552 -234 -22555 0

c  0+1 --> 1
c    (-b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧  p_234) -> (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0)
c  in CNF:
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_2
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_1
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨  b^{234, 2}_0
c  in DIMACS:
 22550  22551  22552 -234 -22553 0
 22550  22551  22552 -234 -22554 0
 22550  22551  22552 -234  22555 0

c  1+1 --> 2
c    (-b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧  b^{234, 1}_0 ∧  p_234) -> (-b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0)
c  in CNF:
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_2
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨  b^{234, 2}_1
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ -p_234 ∨ -b^{234, 2}_0
c  in DIMACS:
 22550  22551 -22552 -234 -22553 0
 22550  22551 -22552 -234  22554 0
 22550  22551 -22552 -234 -22555 0

c  2+1 --> break 
c    (-b^{234, 1}_2 ∧  b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧  p_234) -> break
c  in CNF:
c     b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ -p_234 ∨ break
c  in DIMACS:
 22550 -22551  22552 -234 1162 0


c  2-1 --> 1
c    (-b^{234, 1}_2 ∧  b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧ -p_234) -> (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0)
c  in CNF:
c     b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_2
c     b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_1
c     b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨  b^{234, 2}_0
c  in DIMACS:
 22550 -22551  22552  234 -22553 0
 22550 -22551  22552  234 -22554 0
 22550 -22551  22552  234  22555 0

c  1-1 --> 0
c    (-b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧  b^{234, 1}_0 ∧ -p_234) -> (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧ -b^{234, 2}_0)
c  in CNF:
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_2
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_1
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_0
c  in DIMACS:
 22550  22551 -22552  234 -22553 0
 22550  22551 -22552  234 -22554 0
 22550  22551 -22552  234 -22555 0

c  0-1 --> -1
c    (-b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧ -p_234) -> ( b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0)
c  in CNF:
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨  b^{234, 2}_2
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_1
c     b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨  b^{234, 2}_0
c  in DIMACS:
 22550  22551  22552  234  22553 0
 22550  22551  22552  234 -22554 0
 22550  22551  22552  234  22555 0

c  -1-1 --> -2
c    ( b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧  b^{234, 1}_0 ∧ -p_234) -> ( b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0)
c  in CNF:
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨  b^{234, 2}_2
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨  b^{234, 2}_1
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨  p_234 ∨ -b^{234, 2}_0
c  in DIMACS:
-22550  22551 -22552  234  22553 0
-22550  22551 -22552  234  22554 0
-22550  22551 -22552  234 -22555 0

c  -2-1 --> break 
c    ( b^{234, 1}_2 ∧  b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧ -p_234) -> break
c  in CNF:
c    -b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨  b^{234, 1}_0 ∨  p_234 ∨ break
c  in DIMACS:
-22550 -22551  22552  234 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{234, 1}_2 ∧ -b^{234, 1}_1 ∧ -b^{234, 1}_0 ∧ true) 
c  in CNF:
c    -b^{234, 1}_2 ∨  b^{234, 1}_1 ∨  b^{234, 1}_0 ∨ false 
c  in DIMACS:
-22550  22551  22552  0

c  3 does not represent an automaton state.
c    -(-b^{234, 1}_2 ∧  b^{234, 1}_1 ∧  b^{234, 1}_0 ∧ true) 
c  in CNF:
c     b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ false 
c  in DIMACS:
 22550 -22551 -22552  0
c  -3 does not represent an automaton state.
c    -( b^{234, 1}_2 ∧  b^{234, 1}_1 ∧  b^{234, 1}_0 ∧ true) 
c  in CNF:
c    -b^{234, 1}_2 ∨ -b^{234, 1}_1 ∨ -b^{234, 1}_0 ∨ false 
c  in DIMACS:
-22550 -22551 -22552  0

c i = 2
c  -2+1 --> -1
c    ( b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧  p_468) -> ( b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0)
c  in CNF:
c    -b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨  b^{234, 3}_2
c    -b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_1
c    -b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨  b^{234, 3}_0
c  in DIMACS:
-22553 -22554  22555 -468  22556 0
-22553 -22554  22555 -468 -22557 0
-22553 -22554  22555 -468  22558 0

c  -1+1 --> 0
c    ( b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0 ∧  p_468) -> (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧ -b^{234, 3}_0)
c  in CNF:
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_2
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_1
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_0
c  in DIMACS:
-22553  22554 -22555 -468 -22556 0
-22553  22554 -22555 -468 -22557 0
-22553  22554 -22555 -468 -22558 0

c  0+1 --> 1
c    (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧  p_468) -> (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0)
c  in CNF:
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_2
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_1
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨  b^{234, 3}_0
c  in DIMACS:
 22553  22554  22555 -468 -22556 0
 22553  22554  22555 -468 -22557 0
 22553  22554  22555 -468  22558 0

c  1+1 --> 2
c    (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0 ∧  p_468) -> (-b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0)
c  in CNF:
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_2
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨  b^{234, 3}_1
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ -p_468 ∨ -b^{234, 3}_0
c  in DIMACS:
 22553  22554 -22555 -468 -22556 0
 22553  22554 -22555 -468  22557 0
 22553  22554 -22555 -468 -22558 0

c  2+1 --> break 
c    (-b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧  p_468) -> break
c  in CNF:
c     b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ -p_468 ∨ break
c  in DIMACS:
 22553 -22554  22555 -468 1162 0


c  2-1 --> 1
c    (-b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧ -p_468) -> (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0)
c  in CNF:
c     b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_2
c     b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_1
c     b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨  b^{234, 3}_0
c  in DIMACS:
 22553 -22554  22555  468 -22556 0
 22553 -22554  22555  468 -22557 0
 22553 -22554  22555  468  22558 0

c  1-1 --> 0
c    (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0 ∧ -p_468) -> (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧ -b^{234, 3}_0)
c  in CNF:
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_2
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_1
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_0
c  in DIMACS:
 22553  22554 -22555  468 -22556 0
 22553  22554 -22555  468 -22557 0
 22553  22554 -22555  468 -22558 0

c  0-1 --> -1
c    (-b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧ -p_468) -> ( b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0)
c  in CNF:
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨  b^{234, 3}_2
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_1
c     b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨  b^{234, 3}_0
c  in DIMACS:
 22553  22554  22555  468  22556 0
 22553  22554  22555  468 -22557 0
 22553  22554  22555  468  22558 0

c  -1-1 --> -2
c    ( b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧  b^{234, 2}_0 ∧ -p_468) -> ( b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0)
c  in CNF:
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨  b^{234, 3}_2
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨  b^{234, 3}_1
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨  p_468 ∨ -b^{234, 3}_0
c  in DIMACS:
-22553  22554 -22555  468  22556 0
-22553  22554 -22555  468  22557 0
-22553  22554 -22555  468 -22558 0

c  -2-1 --> break 
c    ( b^{234, 2}_2 ∧  b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧ -p_468) -> break
c  in CNF:
c    -b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨  b^{234, 2}_0 ∨  p_468 ∨ break
c  in DIMACS:
-22553 -22554  22555  468 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{234, 2}_2 ∧ -b^{234, 2}_1 ∧ -b^{234, 2}_0 ∧ true) 
c  in CNF:
c    -b^{234, 2}_2 ∨  b^{234, 2}_1 ∨  b^{234, 2}_0 ∨ false 
c  in DIMACS:
-22553  22554  22555  0

c  3 does not represent an automaton state.
c    -(-b^{234, 2}_2 ∧  b^{234, 2}_1 ∧  b^{234, 2}_0 ∧ true) 
c  in CNF:
c     b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ false 
c  in DIMACS:
 22553 -22554 -22555  0
c  -3 does not represent an automaton state.
c    -( b^{234, 2}_2 ∧  b^{234, 2}_1 ∧  b^{234, 2}_0 ∧ true) 
c  in CNF:
c    -b^{234, 2}_2 ∨ -b^{234, 2}_1 ∨ -b^{234, 2}_0 ∨ false 
c  in DIMACS:
-22553 -22554 -22555  0

c i = 3
c  -2+1 --> -1
c    ( b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧  p_702) -> ( b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0)
c  in CNF:
c    -b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨  b^{234, 4}_2
c    -b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_1
c    -b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨  b^{234, 4}_0
c  in DIMACS:
-22556 -22557  22558 -702  22559 0
-22556 -22557  22558 -702 -22560 0
-22556 -22557  22558 -702  22561 0

c  -1+1 --> 0
c    ( b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0 ∧  p_702) -> (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧ -b^{234, 4}_0)
c  in CNF:
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_2
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_1
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_0
c  in DIMACS:
-22556  22557 -22558 -702 -22559 0
-22556  22557 -22558 -702 -22560 0
-22556  22557 -22558 -702 -22561 0

c  0+1 --> 1
c    (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧  p_702) -> (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0)
c  in CNF:
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_2
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_1
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨  b^{234, 4}_0
c  in DIMACS:
 22556  22557  22558 -702 -22559 0
 22556  22557  22558 -702 -22560 0
 22556  22557  22558 -702  22561 0

c  1+1 --> 2
c    (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0 ∧  p_702) -> (-b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0)
c  in CNF:
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_2
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨  b^{234, 4}_1
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ -p_702 ∨ -b^{234, 4}_0
c  in DIMACS:
 22556  22557 -22558 -702 -22559 0
 22556  22557 -22558 -702  22560 0
 22556  22557 -22558 -702 -22561 0

c  2+1 --> break 
c    (-b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧  p_702) -> break
c  in CNF:
c     b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 22556 -22557  22558 -702 1162 0


c  2-1 --> 1
c    (-b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧ -p_702) -> (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0)
c  in CNF:
c     b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_2
c     b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_1
c     b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨  b^{234, 4}_0
c  in DIMACS:
 22556 -22557  22558  702 -22559 0
 22556 -22557  22558  702 -22560 0
 22556 -22557  22558  702  22561 0

c  1-1 --> 0
c    (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0 ∧ -p_702) -> (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧ -b^{234, 4}_0)
c  in CNF:
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_2
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_1
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_0
c  in DIMACS:
 22556  22557 -22558  702 -22559 0
 22556  22557 -22558  702 -22560 0
 22556  22557 -22558  702 -22561 0

c  0-1 --> -1
c    (-b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧ -p_702) -> ( b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0)
c  in CNF:
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨  b^{234, 4}_2
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_1
c     b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨  b^{234, 4}_0
c  in DIMACS:
 22556  22557  22558  702  22559 0
 22556  22557  22558  702 -22560 0
 22556  22557  22558  702  22561 0

c  -1-1 --> -2
c    ( b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧  b^{234, 3}_0 ∧ -p_702) -> ( b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0)
c  in CNF:
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨  b^{234, 4}_2
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨  b^{234, 4}_1
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨  p_702 ∨ -b^{234, 4}_0
c  in DIMACS:
-22556  22557 -22558  702  22559 0
-22556  22557 -22558  702  22560 0
-22556  22557 -22558  702 -22561 0

c  -2-1 --> break 
c    ( b^{234, 3}_2 ∧  b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨  b^{234, 3}_0 ∨  p_702 ∨ break
c  in DIMACS:
-22556 -22557  22558  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{234, 3}_2 ∧ -b^{234, 3}_1 ∧ -b^{234, 3}_0 ∧ true) 
c  in CNF:
c    -b^{234, 3}_2 ∨  b^{234, 3}_1 ∨  b^{234, 3}_0 ∨ false 
c  in DIMACS:
-22556  22557  22558  0

c  3 does not represent an automaton state.
c    -(-b^{234, 3}_2 ∧  b^{234, 3}_1 ∧  b^{234, 3}_0 ∧ true) 
c  in CNF:
c     b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ false 
c  in DIMACS:
 22556 -22557 -22558  0
c  -3 does not represent an automaton state.
c    -( b^{234, 3}_2 ∧  b^{234, 3}_1 ∧  b^{234, 3}_0 ∧ true) 
c  in CNF:
c    -b^{234, 3}_2 ∨ -b^{234, 3}_1 ∨ -b^{234, 3}_0 ∨ false 
c  in DIMACS:
-22556 -22557 -22558  0

c i = 4
c  -2+1 --> -1
c    ( b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧  p_936) -> ( b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧  b^{234, 5}_0)
c  in CNF:
c    -b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨  b^{234, 5}_2
c    -b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_1
c    -b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨  b^{234, 5}_0
c  in DIMACS:
-22559 -22560  22561 -936  22562 0
-22559 -22560  22561 -936 -22563 0
-22559 -22560  22561 -936  22564 0

c  -1+1 --> 0
c    ( b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0 ∧  p_936) -> (-b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧ -b^{234, 5}_0)
c  in CNF:
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_2
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_1
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_0
c  in DIMACS:
-22559  22560 -22561 -936 -22562 0
-22559  22560 -22561 -936 -22563 0
-22559  22560 -22561 -936 -22564 0

c  0+1 --> 1
c    (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧  p_936) -> (-b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧  b^{234, 5}_0)
c  in CNF:
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_2
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_1
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨  b^{234, 5}_0
c  in DIMACS:
 22559  22560  22561 -936 -22562 0
 22559  22560  22561 -936 -22563 0
 22559  22560  22561 -936  22564 0

c  1+1 --> 2
c    (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0 ∧  p_936) -> (-b^{234, 5}_2 ∧  b^{234, 5}_1 ∧ -b^{234, 5}_0)
c  in CNF:
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_2
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨  b^{234, 5}_1
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ -p_936 ∨ -b^{234, 5}_0
c  in DIMACS:
 22559  22560 -22561 -936 -22562 0
 22559  22560 -22561 -936  22563 0
 22559  22560 -22561 -936 -22564 0

c  2+1 --> break 
c    (-b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧  p_936) -> break
c  in CNF:
c     b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 22559 -22560  22561 -936 1162 0


c  2-1 --> 1
c    (-b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧ -p_936) -> (-b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧  b^{234, 5}_0)
c  in CNF:
c     b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_2
c     b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_1
c     b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨  b^{234, 5}_0
c  in DIMACS:
 22559 -22560  22561  936 -22562 0
 22559 -22560  22561  936 -22563 0
 22559 -22560  22561  936  22564 0

c  1-1 --> 0
c    (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0 ∧ -p_936) -> (-b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧ -b^{234, 5}_0)
c  in CNF:
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_2
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_1
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_0
c  in DIMACS:
 22559  22560 -22561  936 -22562 0
 22559  22560 -22561  936 -22563 0
 22559  22560 -22561  936 -22564 0

c  0-1 --> -1
c    (-b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧ -p_936) -> ( b^{234, 5}_2 ∧ -b^{234, 5}_1 ∧  b^{234, 5}_0)
c  in CNF:
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨  b^{234, 5}_2
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_1
c     b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨  b^{234, 5}_0
c  in DIMACS:
 22559  22560  22561  936  22562 0
 22559  22560  22561  936 -22563 0
 22559  22560  22561  936  22564 0

c  -1-1 --> -2
c    ( b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧  b^{234, 4}_0 ∧ -p_936) -> ( b^{234, 5}_2 ∧  b^{234, 5}_1 ∧ -b^{234, 5}_0)
c  in CNF:
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨  b^{234, 5}_2
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨  b^{234, 5}_1
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨  p_936 ∨ -b^{234, 5}_0
c  in DIMACS:
-22559  22560 -22561  936  22562 0
-22559  22560 -22561  936  22563 0
-22559  22560 -22561  936 -22564 0

c  -2-1 --> break 
c    ( b^{234, 4}_2 ∧  b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨  b^{234, 4}_0 ∨  p_936 ∨ break
c  in DIMACS:
-22559 -22560  22561  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{234, 4}_2 ∧ -b^{234, 4}_1 ∧ -b^{234, 4}_0 ∧ true) 
c  in CNF:
c    -b^{234, 4}_2 ∨  b^{234, 4}_1 ∨  b^{234, 4}_0 ∨ false 
c  in DIMACS:
-22559  22560  22561  0

c  3 does not represent an automaton state.
c    -(-b^{234, 4}_2 ∧  b^{234, 4}_1 ∧  b^{234, 4}_0 ∧ true) 
c  in CNF:
c     b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ false 
c  in DIMACS:
 22559 -22560 -22561  0
c  -3 does not represent an automaton state.
c    -( b^{234, 4}_2 ∧  b^{234, 4}_1 ∧  b^{234, 4}_0 ∧ true) 
c  in CNF:
c    -b^{234, 4}_2 ∨ -b^{234, 4}_1 ∨ -b^{234, 4}_0 ∨ false 
c  in DIMACS:
-22559 -22560 -22561  0

c INIT for k = 235
c    -b^{235, 1}_2
c    -b^{235, 1}_1
c    -b^{235, 1}_0
c  in DIMACS:
-22565 0
-22566 0
-22567 0

c Transitions for k = 235
c i = 1
c  -2+1 --> -1
c    ( b^{235, 1}_2 ∧  b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧  p_235) -> ( b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0)
c  in CNF:
c    -b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨  b^{235, 2}_2
c    -b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_1
c    -b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨  b^{235, 2}_0
c  in DIMACS:
-22565 -22566  22567 -235  22568 0
-22565 -22566  22567 -235 -22569 0
-22565 -22566  22567 -235  22570 0

c  -1+1 --> 0
c    ( b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧  b^{235, 1}_0 ∧  p_235) -> (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧ -b^{235, 2}_0)
c  in CNF:
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_2
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_1
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_0
c  in DIMACS:
-22565  22566 -22567 -235 -22568 0
-22565  22566 -22567 -235 -22569 0
-22565  22566 -22567 -235 -22570 0

c  0+1 --> 1
c    (-b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧  p_235) -> (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0)
c  in CNF:
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_2
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_1
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨  b^{235, 2}_0
c  in DIMACS:
 22565  22566  22567 -235 -22568 0
 22565  22566  22567 -235 -22569 0
 22565  22566  22567 -235  22570 0

c  1+1 --> 2
c    (-b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧  b^{235, 1}_0 ∧  p_235) -> (-b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0)
c  in CNF:
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_2
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨  b^{235, 2}_1
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ -p_235 ∨ -b^{235, 2}_0
c  in DIMACS:
 22565  22566 -22567 -235 -22568 0
 22565  22566 -22567 -235  22569 0
 22565  22566 -22567 -235 -22570 0

c  2+1 --> break 
c    (-b^{235, 1}_2 ∧  b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧  p_235) -> break
c  in CNF:
c     b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ -p_235 ∨ break
c  in DIMACS:
 22565 -22566  22567 -235 1162 0


c  2-1 --> 1
c    (-b^{235, 1}_2 ∧  b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧ -p_235) -> (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0)
c  in CNF:
c     b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_2
c     b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_1
c     b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨  b^{235, 2}_0
c  in DIMACS:
 22565 -22566  22567  235 -22568 0
 22565 -22566  22567  235 -22569 0
 22565 -22566  22567  235  22570 0

c  1-1 --> 0
c    (-b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧  b^{235, 1}_0 ∧ -p_235) -> (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧ -b^{235, 2}_0)
c  in CNF:
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_2
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_1
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_0
c  in DIMACS:
 22565  22566 -22567  235 -22568 0
 22565  22566 -22567  235 -22569 0
 22565  22566 -22567  235 -22570 0

c  0-1 --> -1
c    (-b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧ -p_235) -> ( b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0)
c  in CNF:
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨  b^{235, 2}_2
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_1
c     b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨  b^{235, 2}_0
c  in DIMACS:
 22565  22566  22567  235  22568 0
 22565  22566  22567  235 -22569 0
 22565  22566  22567  235  22570 0

c  -1-1 --> -2
c    ( b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧  b^{235, 1}_0 ∧ -p_235) -> ( b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0)
c  in CNF:
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨  b^{235, 2}_2
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨  b^{235, 2}_1
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨  p_235 ∨ -b^{235, 2}_0
c  in DIMACS:
-22565  22566 -22567  235  22568 0
-22565  22566 -22567  235  22569 0
-22565  22566 -22567  235 -22570 0

c  -2-1 --> break 
c    ( b^{235, 1}_2 ∧  b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧ -p_235) -> break
c  in CNF:
c    -b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨  b^{235, 1}_0 ∨  p_235 ∨ break
c  in DIMACS:
-22565 -22566  22567  235 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{235, 1}_2 ∧ -b^{235, 1}_1 ∧ -b^{235, 1}_0 ∧ true) 
c  in CNF:
c    -b^{235, 1}_2 ∨  b^{235, 1}_1 ∨  b^{235, 1}_0 ∨ false 
c  in DIMACS:
-22565  22566  22567  0

c  3 does not represent an automaton state.
c    -(-b^{235, 1}_2 ∧  b^{235, 1}_1 ∧  b^{235, 1}_0 ∧ true) 
c  in CNF:
c     b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ false 
c  in DIMACS:
 22565 -22566 -22567  0
c  -3 does not represent an automaton state.
c    -( b^{235, 1}_2 ∧  b^{235, 1}_1 ∧  b^{235, 1}_0 ∧ true) 
c  in CNF:
c    -b^{235, 1}_2 ∨ -b^{235, 1}_1 ∨ -b^{235, 1}_0 ∨ false 
c  in DIMACS:
-22565 -22566 -22567  0

c i = 2
c  -2+1 --> -1
c    ( b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧  p_470) -> ( b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0)
c  in CNF:
c    -b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨  b^{235, 3}_2
c    -b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_1
c    -b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨  b^{235, 3}_0
c  in DIMACS:
-22568 -22569  22570 -470  22571 0
-22568 -22569  22570 -470 -22572 0
-22568 -22569  22570 -470  22573 0

c  -1+1 --> 0
c    ( b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0 ∧  p_470) -> (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧ -b^{235, 3}_0)
c  in CNF:
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_2
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_1
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_0
c  in DIMACS:
-22568  22569 -22570 -470 -22571 0
-22568  22569 -22570 -470 -22572 0
-22568  22569 -22570 -470 -22573 0

c  0+1 --> 1
c    (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧  p_470) -> (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0)
c  in CNF:
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_2
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_1
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨  b^{235, 3}_0
c  in DIMACS:
 22568  22569  22570 -470 -22571 0
 22568  22569  22570 -470 -22572 0
 22568  22569  22570 -470  22573 0

c  1+1 --> 2
c    (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0 ∧  p_470) -> (-b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0)
c  in CNF:
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_2
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨  b^{235, 3}_1
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ -p_470 ∨ -b^{235, 3}_0
c  in DIMACS:
 22568  22569 -22570 -470 -22571 0
 22568  22569 -22570 -470  22572 0
 22568  22569 -22570 -470 -22573 0

c  2+1 --> break 
c    (-b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧  p_470) -> break
c  in CNF:
c     b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ -p_470 ∨ break
c  in DIMACS:
 22568 -22569  22570 -470 1162 0


c  2-1 --> 1
c    (-b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧ -p_470) -> (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0)
c  in CNF:
c     b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_2
c     b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_1
c     b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨  b^{235, 3}_0
c  in DIMACS:
 22568 -22569  22570  470 -22571 0
 22568 -22569  22570  470 -22572 0
 22568 -22569  22570  470  22573 0

c  1-1 --> 0
c    (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0 ∧ -p_470) -> (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧ -b^{235, 3}_0)
c  in CNF:
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_2
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_1
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_0
c  in DIMACS:
 22568  22569 -22570  470 -22571 0
 22568  22569 -22570  470 -22572 0
 22568  22569 -22570  470 -22573 0

c  0-1 --> -1
c    (-b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧ -p_470) -> ( b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0)
c  in CNF:
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨  b^{235, 3}_2
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_1
c     b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨  b^{235, 3}_0
c  in DIMACS:
 22568  22569  22570  470  22571 0
 22568  22569  22570  470 -22572 0
 22568  22569  22570  470  22573 0

c  -1-1 --> -2
c    ( b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧  b^{235, 2}_0 ∧ -p_470) -> ( b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0)
c  in CNF:
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨  b^{235, 3}_2
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨  b^{235, 3}_1
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨  p_470 ∨ -b^{235, 3}_0
c  in DIMACS:
-22568  22569 -22570  470  22571 0
-22568  22569 -22570  470  22572 0
-22568  22569 -22570  470 -22573 0

c  -2-1 --> break 
c    ( b^{235, 2}_2 ∧  b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧ -p_470) -> break
c  in CNF:
c    -b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨  b^{235, 2}_0 ∨  p_470 ∨ break
c  in DIMACS:
-22568 -22569  22570  470 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{235, 2}_2 ∧ -b^{235, 2}_1 ∧ -b^{235, 2}_0 ∧ true) 
c  in CNF:
c    -b^{235, 2}_2 ∨  b^{235, 2}_1 ∨  b^{235, 2}_0 ∨ false 
c  in DIMACS:
-22568  22569  22570  0

c  3 does not represent an automaton state.
c    -(-b^{235, 2}_2 ∧  b^{235, 2}_1 ∧  b^{235, 2}_0 ∧ true) 
c  in CNF:
c     b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ false 
c  in DIMACS:
 22568 -22569 -22570  0
c  -3 does not represent an automaton state.
c    -( b^{235, 2}_2 ∧  b^{235, 2}_1 ∧  b^{235, 2}_0 ∧ true) 
c  in CNF:
c    -b^{235, 2}_2 ∨ -b^{235, 2}_1 ∨ -b^{235, 2}_0 ∨ false 
c  in DIMACS:
-22568 -22569 -22570  0

c i = 3
c  -2+1 --> -1
c    ( b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧  p_705) -> ( b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0)
c  in CNF:
c    -b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨  b^{235, 4}_2
c    -b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_1
c    -b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨  b^{235, 4}_0
c  in DIMACS:
-22571 -22572  22573 -705  22574 0
-22571 -22572  22573 -705 -22575 0
-22571 -22572  22573 -705  22576 0

c  -1+1 --> 0
c    ( b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0 ∧  p_705) -> (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧ -b^{235, 4}_0)
c  in CNF:
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_2
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_1
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_0
c  in DIMACS:
-22571  22572 -22573 -705 -22574 0
-22571  22572 -22573 -705 -22575 0
-22571  22572 -22573 -705 -22576 0

c  0+1 --> 1
c    (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧  p_705) -> (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0)
c  in CNF:
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_2
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_1
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨  b^{235, 4}_0
c  in DIMACS:
 22571  22572  22573 -705 -22574 0
 22571  22572  22573 -705 -22575 0
 22571  22572  22573 -705  22576 0

c  1+1 --> 2
c    (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0 ∧  p_705) -> (-b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0)
c  in CNF:
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_2
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨  b^{235, 4}_1
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ -p_705 ∨ -b^{235, 4}_0
c  in DIMACS:
 22571  22572 -22573 -705 -22574 0
 22571  22572 -22573 -705  22575 0
 22571  22572 -22573 -705 -22576 0

c  2+1 --> break 
c    (-b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧  p_705) -> break
c  in CNF:
c     b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ -p_705 ∨ break
c  in DIMACS:
 22571 -22572  22573 -705 1162 0


c  2-1 --> 1
c    (-b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧ -p_705) -> (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0)
c  in CNF:
c     b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_2
c     b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_1
c     b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨  b^{235, 4}_0
c  in DIMACS:
 22571 -22572  22573  705 -22574 0
 22571 -22572  22573  705 -22575 0
 22571 -22572  22573  705  22576 0

c  1-1 --> 0
c    (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0 ∧ -p_705) -> (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧ -b^{235, 4}_0)
c  in CNF:
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_2
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_1
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_0
c  in DIMACS:
 22571  22572 -22573  705 -22574 0
 22571  22572 -22573  705 -22575 0
 22571  22572 -22573  705 -22576 0

c  0-1 --> -1
c    (-b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧ -p_705) -> ( b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0)
c  in CNF:
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨  b^{235, 4}_2
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_1
c     b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨  b^{235, 4}_0
c  in DIMACS:
 22571  22572  22573  705  22574 0
 22571  22572  22573  705 -22575 0
 22571  22572  22573  705  22576 0

c  -1-1 --> -2
c    ( b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧  b^{235, 3}_0 ∧ -p_705) -> ( b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0)
c  in CNF:
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨  b^{235, 4}_2
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨  b^{235, 4}_1
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨  p_705 ∨ -b^{235, 4}_0
c  in DIMACS:
-22571  22572 -22573  705  22574 0
-22571  22572 -22573  705  22575 0
-22571  22572 -22573  705 -22576 0

c  -2-1 --> break 
c    ( b^{235, 3}_2 ∧  b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧ -p_705) -> break
c  in CNF:
c    -b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨  b^{235, 3}_0 ∨  p_705 ∨ break
c  in DIMACS:
-22571 -22572  22573  705 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{235, 3}_2 ∧ -b^{235, 3}_1 ∧ -b^{235, 3}_0 ∧ true) 
c  in CNF:
c    -b^{235, 3}_2 ∨  b^{235, 3}_1 ∨  b^{235, 3}_0 ∨ false 
c  in DIMACS:
-22571  22572  22573  0

c  3 does not represent an automaton state.
c    -(-b^{235, 3}_2 ∧  b^{235, 3}_1 ∧  b^{235, 3}_0 ∧ true) 
c  in CNF:
c     b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ false 
c  in DIMACS:
 22571 -22572 -22573  0
c  -3 does not represent an automaton state.
c    -( b^{235, 3}_2 ∧  b^{235, 3}_1 ∧  b^{235, 3}_0 ∧ true) 
c  in CNF:
c    -b^{235, 3}_2 ∨ -b^{235, 3}_1 ∨ -b^{235, 3}_0 ∨ false 
c  in DIMACS:
-22571 -22572 -22573  0

c i = 4
c  -2+1 --> -1
c    ( b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧  p_940) -> ( b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧  b^{235, 5}_0)
c  in CNF:
c    -b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨  b^{235, 5}_2
c    -b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_1
c    -b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨  b^{235, 5}_0
c  in DIMACS:
-22574 -22575  22576 -940  22577 0
-22574 -22575  22576 -940 -22578 0
-22574 -22575  22576 -940  22579 0

c  -1+1 --> 0
c    ( b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0 ∧  p_940) -> (-b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧ -b^{235, 5}_0)
c  in CNF:
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_2
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_1
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_0
c  in DIMACS:
-22574  22575 -22576 -940 -22577 0
-22574  22575 -22576 -940 -22578 0
-22574  22575 -22576 -940 -22579 0

c  0+1 --> 1
c    (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧  p_940) -> (-b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧  b^{235, 5}_0)
c  in CNF:
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_2
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_1
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨  b^{235, 5}_0
c  in DIMACS:
 22574  22575  22576 -940 -22577 0
 22574  22575  22576 -940 -22578 0
 22574  22575  22576 -940  22579 0

c  1+1 --> 2
c    (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0 ∧  p_940) -> (-b^{235, 5}_2 ∧  b^{235, 5}_1 ∧ -b^{235, 5}_0)
c  in CNF:
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_2
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨  b^{235, 5}_1
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ -p_940 ∨ -b^{235, 5}_0
c  in DIMACS:
 22574  22575 -22576 -940 -22577 0
 22574  22575 -22576 -940  22578 0
 22574  22575 -22576 -940 -22579 0

c  2+1 --> break 
c    (-b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧  p_940) -> break
c  in CNF:
c     b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ -p_940 ∨ break
c  in DIMACS:
 22574 -22575  22576 -940 1162 0


c  2-1 --> 1
c    (-b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧ -p_940) -> (-b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧  b^{235, 5}_0)
c  in CNF:
c     b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_2
c     b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_1
c     b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨  b^{235, 5}_0
c  in DIMACS:
 22574 -22575  22576  940 -22577 0
 22574 -22575  22576  940 -22578 0
 22574 -22575  22576  940  22579 0

c  1-1 --> 0
c    (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0 ∧ -p_940) -> (-b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧ -b^{235, 5}_0)
c  in CNF:
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_2
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_1
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_0
c  in DIMACS:
 22574  22575 -22576  940 -22577 0
 22574  22575 -22576  940 -22578 0
 22574  22575 -22576  940 -22579 0

c  0-1 --> -1
c    (-b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧ -p_940) -> ( b^{235, 5}_2 ∧ -b^{235, 5}_1 ∧  b^{235, 5}_0)
c  in CNF:
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨  b^{235, 5}_2
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_1
c     b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨  b^{235, 5}_0
c  in DIMACS:
 22574  22575  22576  940  22577 0
 22574  22575  22576  940 -22578 0
 22574  22575  22576  940  22579 0

c  -1-1 --> -2
c    ( b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧  b^{235, 4}_0 ∧ -p_940) -> ( b^{235, 5}_2 ∧  b^{235, 5}_1 ∧ -b^{235, 5}_0)
c  in CNF:
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨  b^{235, 5}_2
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨  b^{235, 5}_1
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨  p_940 ∨ -b^{235, 5}_0
c  in DIMACS:
-22574  22575 -22576  940  22577 0
-22574  22575 -22576  940  22578 0
-22574  22575 -22576  940 -22579 0

c  -2-1 --> break 
c    ( b^{235, 4}_2 ∧  b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧ -p_940) -> break
c  in CNF:
c    -b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨  b^{235, 4}_0 ∨  p_940 ∨ break
c  in DIMACS:
-22574 -22575  22576  940 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{235, 4}_2 ∧ -b^{235, 4}_1 ∧ -b^{235, 4}_0 ∧ true) 
c  in CNF:
c    -b^{235, 4}_2 ∨  b^{235, 4}_1 ∨  b^{235, 4}_0 ∨ false 
c  in DIMACS:
-22574  22575  22576  0

c  3 does not represent an automaton state.
c    -(-b^{235, 4}_2 ∧  b^{235, 4}_1 ∧  b^{235, 4}_0 ∧ true) 
c  in CNF:
c     b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ false 
c  in DIMACS:
 22574 -22575 -22576  0
c  -3 does not represent an automaton state.
c    -( b^{235, 4}_2 ∧  b^{235, 4}_1 ∧  b^{235, 4}_0 ∧ true) 
c  in CNF:
c    -b^{235, 4}_2 ∨ -b^{235, 4}_1 ∨ -b^{235, 4}_0 ∨ false 
c  in DIMACS:
-22574 -22575 -22576  0

c INIT for k = 236
c    -b^{236, 1}_2
c    -b^{236, 1}_1
c    -b^{236, 1}_0
c  in DIMACS:
-22580 0
-22581 0
-22582 0

c Transitions for k = 236
c i = 1
c  -2+1 --> -1
c    ( b^{236, 1}_2 ∧  b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧  p_236) -> ( b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0)
c  in CNF:
c    -b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨  b^{236, 2}_2
c    -b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_1
c    -b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨  b^{236, 2}_0
c  in DIMACS:
-22580 -22581  22582 -236  22583 0
-22580 -22581  22582 -236 -22584 0
-22580 -22581  22582 -236  22585 0

c  -1+1 --> 0
c    ( b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧  b^{236, 1}_0 ∧  p_236) -> (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧ -b^{236, 2}_0)
c  in CNF:
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_2
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_1
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_0
c  in DIMACS:
-22580  22581 -22582 -236 -22583 0
-22580  22581 -22582 -236 -22584 0
-22580  22581 -22582 -236 -22585 0

c  0+1 --> 1
c    (-b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧  p_236) -> (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0)
c  in CNF:
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_2
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_1
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨  b^{236, 2}_0
c  in DIMACS:
 22580  22581  22582 -236 -22583 0
 22580  22581  22582 -236 -22584 0
 22580  22581  22582 -236  22585 0

c  1+1 --> 2
c    (-b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧  b^{236, 1}_0 ∧  p_236) -> (-b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0)
c  in CNF:
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_2
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨  b^{236, 2}_1
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ -p_236 ∨ -b^{236, 2}_0
c  in DIMACS:
 22580  22581 -22582 -236 -22583 0
 22580  22581 -22582 -236  22584 0
 22580  22581 -22582 -236 -22585 0

c  2+1 --> break 
c    (-b^{236, 1}_2 ∧  b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧  p_236) -> break
c  in CNF:
c     b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ -p_236 ∨ break
c  in DIMACS:
 22580 -22581  22582 -236 1162 0


c  2-1 --> 1
c    (-b^{236, 1}_2 ∧  b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧ -p_236) -> (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0)
c  in CNF:
c     b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_2
c     b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_1
c     b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨  b^{236, 2}_0
c  in DIMACS:
 22580 -22581  22582  236 -22583 0
 22580 -22581  22582  236 -22584 0
 22580 -22581  22582  236  22585 0

c  1-1 --> 0
c    (-b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧  b^{236, 1}_0 ∧ -p_236) -> (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧ -b^{236, 2}_0)
c  in CNF:
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_2
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_1
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_0
c  in DIMACS:
 22580  22581 -22582  236 -22583 0
 22580  22581 -22582  236 -22584 0
 22580  22581 -22582  236 -22585 0

c  0-1 --> -1
c    (-b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧ -p_236) -> ( b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0)
c  in CNF:
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨  b^{236, 2}_2
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_1
c     b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨  b^{236, 2}_0
c  in DIMACS:
 22580  22581  22582  236  22583 0
 22580  22581  22582  236 -22584 0
 22580  22581  22582  236  22585 0

c  -1-1 --> -2
c    ( b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧  b^{236, 1}_0 ∧ -p_236) -> ( b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0)
c  in CNF:
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨  b^{236, 2}_2
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨  b^{236, 2}_1
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨  p_236 ∨ -b^{236, 2}_0
c  in DIMACS:
-22580  22581 -22582  236  22583 0
-22580  22581 -22582  236  22584 0
-22580  22581 -22582  236 -22585 0

c  -2-1 --> break 
c    ( b^{236, 1}_2 ∧  b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧ -p_236) -> break
c  in CNF:
c    -b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨  b^{236, 1}_0 ∨  p_236 ∨ break
c  in DIMACS:
-22580 -22581  22582  236 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{236, 1}_2 ∧ -b^{236, 1}_1 ∧ -b^{236, 1}_0 ∧ true) 
c  in CNF:
c    -b^{236, 1}_2 ∨  b^{236, 1}_1 ∨  b^{236, 1}_0 ∨ false 
c  in DIMACS:
-22580  22581  22582  0

c  3 does not represent an automaton state.
c    -(-b^{236, 1}_2 ∧  b^{236, 1}_1 ∧  b^{236, 1}_0 ∧ true) 
c  in CNF:
c     b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ false 
c  in DIMACS:
 22580 -22581 -22582  0
c  -3 does not represent an automaton state.
c    -( b^{236, 1}_2 ∧  b^{236, 1}_1 ∧  b^{236, 1}_0 ∧ true) 
c  in CNF:
c    -b^{236, 1}_2 ∨ -b^{236, 1}_1 ∨ -b^{236, 1}_0 ∨ false 
c  in DIMACS:
-22580 -22581 -22582  0

c i = 2
c  -2+1 --> -1
c    ( b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧  p_472) -> ( b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0)
c  in CNF:
c    -b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨  b^{236, 3}_2
c    -b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_1
c    -b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨  b^{236, 3}_0
c  in DIMACS:
-22583 -22584  22585 -472  22586 0
-22583 -22584  22585 -472 -22587 0
-22583 -22584  22585 -472  22588 0

c  -1+1 --> 0
c    ( b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0 ∧  p_472) -> (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧ -b^{236, 3}_0)
c  in CNF:
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_2
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_1
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_0
c  in DIMACS:
-22583  22584 -22585 -472 -22586 0
-22583  22584 -22585 -472 -22587 0
-22583  22584 -22585 -472 -22588 0

c  0+1 --> 1
c    (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧  p_472) -> (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0)
c  in CNF:
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_2
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_1
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨  b^{236, 3}_0
c  in DIMACS:
 22583  22584  22585 -472 -22586 0
 22583  22584  22585 -472 -22587 0
 22583  22584  22585 -472  22588 0

c  1+1 --> 2
c    (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0 ∧  p_472) -> (-b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0)
c  in CNF:
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_2
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨  b^{236, 3}_1
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ -p_472 ∨ -b^{236, 3}_0
c  in DIMACS:
 22583  22584 -22585 -472 -22586 0
 22583  22584 -22585 -472  22587 0
 22583  22584 -22585 -472 -22588 0

c  2+1 --> break 
c    (-b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧  p_472) -> break
c  in CNF:
c     b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ -p_472 ∨ break
c  in DIMACS:
 22583 -22584  22585 -472 1162 0


c  2-1 --> 1
c    (-b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧ -p_472) -> (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0)
c  in CNF:
c     b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_2
c     b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_1
c     b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨  b^{236, 3}_0
c  in DIMACS:
 22583 -22584  22585  472 -22586 0
 22583 -22584  22585  472 -22587 0
 22583 -22584  22585  472  22588 0

c  1-1 --> 0
c    (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0 ∧ -p_472) -> (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧ -b^{236, 3}_0)
c  in CNF:
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_2
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_1
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_0
c  in DIMACS:
 22583  22584 -22585  472 -22586 0
 22583  22584 -22585  472 -22587 0
 22583  22584 -22585  472 -22588 0

c  0-1 --> -1
c    (-b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧ -p_472) -> ( b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0)
c  in CNF:
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨  b^{236, 3}_2
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_1
c     b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨  b^{236, 3}_0
c  in DIMACS:
 22583  22584  22585  472  22586 0
 22583  22584  22585  472 -22587 0
 22583  22584  22585  472  22588 0

c  -1-1 --> -2
c    ( b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧  b^{236, 2}_0 ∧ -p_472) -> ( b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0)
c  in CNF:
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨  b^{236, 3}_2
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨  b^{236, 3}_1
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨  p_472 ∨ -b^{236, 3}_0
c  in DIMACS:
-22583  22584 -22585  472  22586 0
-22583  22584 -22585  472  22587 0
-22583  22584 -22585  472 -22588 0

c  -2-1 --> break 
c    ( b^{236, 2}_2 ∧  b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧ -p_472) -> break
c  in CNF:
c    -b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨  b^{236, 2}_0 ∨  p_472 ∨ break
c  in DIMACS:
-22583 -22584  22585  472 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{236, 2}_2 ∧ -b^{236, 2}_1 ∧ -b^{236, 2}_0 ∧ true) 
c  in CNF:
c    -b^{236, 2}_2 ∨  b^{236, 2}_1 ∨  b^{236, 2}_0 ∨ false 
c  in DIMACS:
-22583  22584  22585  0

c  3 does not represent an automaton state.
c    -(-b^{236, 2}_2 ∧  b^{236, 2}_1 ∧  b^{236, 2}_0 ∧ true) 
c  in CNF:
c     b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ false 
c  in DIMACS:
 22583 -22584 -22585  0
c  -3 does not represent an automaton state.
c    -( b^{236, 2}_2 ∧  b^{236, 2}_1 ∧  b^{236, 2}_0 ∧ true) 
c  in CNF:
c    -b^{236, 2}_2 ∨ -b^{236, 2}_1 ∨ -b^{236, 2}_0 ∨ false 
c  in DIMACS:
-22583 -22584 -22585  0

c i = 3
c  -2+1 --> -1
c    ( b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧  p_708) -> ( b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0)
c  in CNF:
c    -b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨  b^{236, 4}_2
c    -b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_1
c    -b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨  b^{236, 4}_0
c  in DIMACS:
-22586 -22587  22588 -708  22589 0
-22586 -22587  22588 -708 -22590 0
-22586 -22587  22588 -708  22591 0

c  -1+1 --> 0
c    ( b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0 ∧  p_708) -> (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧ -b^{236, 4}_0)
c  in CNF:
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_2
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_1
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_0
c  in DIMACS:
-22586  22587 -22588 -708 -22589 0
-22586  22587 -22588 -708 -22590 0
-22586  22587 -22588 -708 -22591 0

c  0+1 --> 1
c    (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧  p_708) -> (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0)
c  in CNF:
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_2
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_1
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨  b^{236, 4}_0
c  in DIMACS:
 22586  22587  22588 -708 -22589 0
 22586  22587  22588 -708 -22590 0
 22586  22587  22588 -708  22591 0

c  1+1 --> 2
c    (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0 ∧  p_708) -> (-b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0)
c  in CNF:
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_2
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨  b^{236, 4}_1
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ -p_708 ∨ -b^{236, 4}_0
c  in DIMACS:
 22586  22587 -22588 -708 -22589 0
 22586  22587 -22588 -708  22590 0
 22586  22587 -22588 -708 -22591 0

c  2+1 --> break 
c    (-b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧  p_708) -> break
c  in CNF:
c     b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 22586 -22587  22588 -708 1162 0


c  2-1 --> 1
c    (-b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧ -p_708) -> (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0)
c  in CNF:
c     b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_2
c     b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_1
c     b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨  b^{236, 4}_0
c  in DIMACS:
 22586 -22587  22588  708 -22589 0
 22586 -22587  22588  708 -22590 0
 22586 -22587  22588  708  22591 0

c  1-1 --> 0
c    (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0 ∧ -p_708) -> (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧ -b^{236, 4}_0)
c  in CNF:
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_2
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_1
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_0
c  in DIMACS:
 22586  22587 -22588  708 -22589 0
 22586  22587 -22588  708 -22590 0
 22586  22587 -22588  708 -22591 0

c  0-1 --> -1
c    (-b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧ -p_708) -> ( b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0)
c  in CNF:
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨  b^{236, 4}_2
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_1
c     b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨  b^{236, 4}_0
c  in DIMACS:
 22586  22587  22588  708  22589 0
 22586  22587  22588  708 -22590 0
 22586  22587  22588  708  22591 0

c  -1-1 --> -2
c    ( b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧  b^{236, 3}_0 ∧ -p_708) -> ( b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0)
c  in CNF:
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨  b^{236, 4}_2
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨  b^{236, 4}_1
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨  p_708 ∨ -b^{236, 4}_0
c  in DIMACS:
-22586  22587 -22588  708  22589 0
-22586  22587 -22588  708  22590 0
-22586  22587 -22588  708 -22591 0

c  -2-1 --> break 
c    ( b^{236, 3}_2 ∧  b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨  b^{236, 3}_0 ∨  p_708 ∨ break
c  in DIMACS:
-22586 -22587  22588  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{236, 3}_2 ∧ -b^{236, 3}_1 ∧ -b^{236, 3}_0 ∧ true) 
c  in CNF:
c    -b^{236, 3}_2 ∨  b^{236, 3}_1 ∨  b^{236, 3}_0 ∨ false 
c  in DIMACS:
-22586  22587  22588  0

c  3 does not represent an automaton state.
c    -(-b^{236, 3}_2 ∧  b^{236, 3}_1 ∧  b^{236, 3}_0 ∧ true) 
c  in CNF:
c     b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ false 
c  in DIMACS:
 22586 -22587 -22588  0
c  -3 does not represent an automaton state.
c    -( b^{236, 3}_2 ∧  b^{236, 3}_1 ∧  b^{236, 3}_0 ∧ true) 
c  in CNF:
c    -b^{236, 3}_2 ∨ -b^{236, 3}_1 ∨ -b^{236, 3}_0 ∨ false 
c  in DIMACS:
-22586 -22587 -22588  0

c i = 4
c  -2+1 --> -1
c    ( b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧  p_944) -> ( b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧  b^{236, 5}_0)
c  in CNF:
c    -b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨  b^{236, 5}_2
c    -b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_1
c    -b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨  b^{236, 5}_0
c  in DIMACS:
-22589 -22590  22591 -944  22592 0
-22589 -22590  22591 -944 -22593 0
-22589 -22590  22591 -944  22594 0

c  -1+1 --> 0
c    ( b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0 ∧  p_944) -> (-b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧ -b^{236, 5}_0)
c  in CNF:
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_2
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_1
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_0
c  in DIMACS:
-22589  22590 -22591 -944 -22592 0
-22589  22590 -22591 -944 -22593 0
-22589  22590 -22591 -944 -22594 0

c  0+1 --> 1
c    (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧  p_944) -> (-b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧  b^{236, 5}_0)
c  in CNF:
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_2
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_1
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨  b^{236, 5}_0
c  in DIMACS:
 22589  22590  22591 -944 -22592 0
 22589  22590  22591 -944 -22593 0
 22589  22590  22591 -944  22594 0

c  1+1 --> 2
c    (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0 ∧  p_944) -> (-b^{236, 5}_2 ∧  b^{236, 5}_1 ∧ -b^{236, 5}_0)
c  in CNF:
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_2
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨  b^{236, 5}_1
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ -p_944 ∨ -b^{236, 5}_0
c  in DIMACS:
 22589  22590 -22591 -944 -22592 0
 22589  22590 -22591 -944  22593 0
 22589  22590 -22591 -944 -22594 0

c  2+1 --> break 
c    (-b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧  p_944) -> break
c  in CNF:
c     b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ -p_944 ∨ break
c  in DIMACS:
 22589 -22590  22591 -944 1162 0


c  2-1 --> 1
c    (-b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧ -p_944) -> (-b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧  b^{236, 5}_0)
c  in CNF:
c     b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_2
c     b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_1
c     b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨  b^{236, 5}_0
c  in DIMACS:
 22589 -22590  22591  944 -22592 0
 22589 -22590  22591  944 -22593 0
 22589 -22590  22591  944  22594 0

c  1-1 --> 0
c    (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0 ∧ -p_944) -> (-b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧ -b^{236, 5}_0)
c  in CNF:
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_2
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_1
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_0
c  in DIMACS:
 22589  22590 -22591  944 -22592 0
 22589  22590 -22591  944 -22593 0
 22589  22590 -22591  944 -22594 0

c  0-1 --> -1
c    (-b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧ -p_944) -> ( b^{236, 5}_2 ∧ -b^{236, 5}_1 ∧  b^{236, 5}_0)
c  in CNF:
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨  b^{236, 5}_2
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_1
c     b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨  b^{236, 5}_0
c  in DIMACS:
 22589  22590  22591  944  22592 0
 22589  22590  22591  944 -22593 0
 22589  22590  22591  944  22594 0

c  -1-1 --> -2
c    ( b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧  b^{236, 4}_0 ∧ -p_944) -> ( b^{236, 5}_2 ∧  b^{236, 5}_1 ∧ -b^{236, 5}_0)
c  in CNF:
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨  b^{236, 5}_2
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨  b^{236, 5}_1
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨  p_944 ∨ -b^{236, 5}_0
c  in DIMACS:
-22589  22590 -22591  944  22592 0
-22589  22590 -22591  944  22593 0
-22589  22590 -22591  944 -22594 0

c  -2-1 --> break 
c    ( b^{236, 4}_2 ∧  b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧ -p_944) -> break
c  in CNF:
c    -b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨  b^{236, 4}_0 ∨  p_944 ∨ break
c  in DIMACS:
-22589 -22590  22591  944 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{236, 4}_2 ∧ -b^{236, 4}_1 ∧ -b^{236, 4}_0 ∧ true) 
c  in CNF:
c    -b^{236, 4}_2 ∨  b^{236, 4}_1 ∨  b^{236, 4}_0 ∨ false 
c  in DIMACS:
-22589  22590  22591  0

c  3 does not represent an automaton state.
c    -(-b^{236, 4}_2 ∧  b^{236, 4}_1 ∧  b^{236, 4}_0 ∧ true) 
c  in CNF:
c     b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ false 
c  in DIMACS:
 22589 -22590 -22591  0
c  -3 does not represent an automaton state.
c    -( b^{236, 4}_2 ∧  b^{236, 4}_1 ∧  b^{236, 4}_0 ∧ true) 
c  in CNF:
c    -b^{236, 4}_2 ∨ -b^{236, 4}_1 ∨ -b^{236, 4}_0 ∨ false 
c  in DIMACS:
-22589 -22590 -22591  0

c INIT for k = 237
c    -b^{237, 1}_2
c    -b^{237, 1}_1
c    -b^{237, 1}_0
c  in DIMACS:
-22595 0
-22596 0
-22597 0

c Transitions for k = 237
c i = 1
c  -2+1 --> -1
c    ( b^{237, 1}_2 ∧  b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧  p_237) -> ( b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0)
c  in CNF:
c    -b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨  b^{237, 2}_2
c    -b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_1
c    -b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨  b^{237, 2}_0
c  in DIMACS:
-22595 -22596  22597 -237  22598 0
-22595 -22596  22597 -237 -22599 0
-22595 -22596  22597 -237  22600 0

c  -1+1 --> 0
c    ( b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧  b^{237, 1}_0 ∧  p_237) -> (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧ -b^{237, 2}_0)
c  in CNF:
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_2
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_1
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_0
c  in DIMACS:
-22595  22596 -22597 -237 -22598 0
-22595  22596 -22597 -237 -22599 0
-22595  22596 -22597 -237 -22600 0

c  0+1 --> 1
c    (-b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧  p_237) -> (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0)
c  in CNF:
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_2
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_1
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨  b^{237, 2}_0
c  in DIMACS:
 22595  22596  22597 -237 -22598 0
 22595  22596  22597 -237 -22599 0
 22595  22596  22597 -237  22600 0

c  1+1 --> 2
c    (-b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧  b^{237, 1}_0 ∧  p_237) -> (-b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0)
c  in CNF:
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_2
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨  b^{237, 2}_1
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ -p_237 ∨ -b^{237, 2}_0
c  in DIMACS:
 22595  22596 -22597 -237 -22598 0
 22595  22596 -22597 -237  22599 0
 22595  22596 -22597 -237 -22600 0

c  2+1 --> break 
c    (-b^{237, 1}_2 ∧  b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧  p_237) -> break
c  in CNF:
c     b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ -p_237 ∨ break
c  in DIMACS:
 22595 -22596  22597 -237 1162 0


c  2-1 --> 1
c    (-b^{237, 1}_2 ∧  b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧ -p_237) -> (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0)
c  in CNF:
c     b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_2
c     b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_1
c     b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨  b^{237, 2}_0
c  in DIMACS:
 22595 -22596  22597  237 -22598 0
 22595 -22596  22597  237 -22599 0
 22595 -22596  22597  237  22600 0

c  1-1 --> 0
c    (-b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧  b^{237, 1}_0 ∧ -p_237) -> (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧ -b^{237, 2}_0)
c  in CNF:
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_2
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_1
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_0
c  in DIMACS:
 22595  22596 -22597  237 -22598 0
 22595  22596 -22597  237 -22599 0
 22595  22596 -22597  237 -22600 0

c  0-1 --> -1
c    (-b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧ -p_237) -> ( b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0)
c  in CNF:
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨  b^{237, 2}_2
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_1
c     b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨  b^{237, 2}_0
c  in DIMACS:
 22595  22596  22597  237  22598 0
 22595  22596  22597  237 -22599 0
 22595  22596  22597  237  22600 0

c  -1-1 --> -2
c    ( b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧  b^{237, 1}_0 ∧ -p_237) -> ( b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0)
c  in CNF:
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨  b^{237, 2}_2
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨  b^{237, 2}_1
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨  p_237 ∨ -b^{237, 2}_0
c  in DIMACS:
-22595  22596 -22597  237  22598 0
-22595  22596 -22597  237  22599 0
-22595  22596 -22597  237 -22600 0

c  -2-1 --> break 
c    ( b^{237, 1}_2 ∧  b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧ -p_237) -> break
c  in CNF:
c    -b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨  b^{237, 1}_0 ∨  p_237 ∨ break
c  in DIMACS:
-22595 -22596  22597  237 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{237, 1}_2 ∧ -b^{237, 1}_1 ∧ -b^{237, 1}_0 ∧ true) 
c  in CNF:
c    -b^{237, 1}_2 ∨  b^{237, 1}_1 ∨  b^{237, 1}_0 ∨ false 
c  in DIMACS:
-22595  22596  22597  0

c  3 does not represent an automaton state.
c    -(-b^{237, 1}_2 ∧  b^{237, 1}_1 ∧  b^{237, 1}_0 ∧ true) 
c  in CNF:
c     b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ false 
c  in DIMACS:
 22595 -22596 -22597  0
c  -3 does not represent an automaton state.
c    -( b^{237, 1}_2 ∧  b^{237, 1}_1 ∧  b^{237, 1}_0 ∧ true) 
c  in CNF:
c    -b^{237, 1}_2 ∨ -b^{237, 1}_1 ∨ -b^{237, 1}_0 ∨ false 
c  in DIMACS:
-22595 -22596 -22597  0

c i = 2
c  -2+1 --> -1
c    ( b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧  p_474) -> ( b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0)
c  in CNF:
c    -b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨  b^{237, 3}_2
c    -b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_1
c    -b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨  b^{237, 3}_0
c  in DIMACS:
-22598 -22599  22600 -474  22601 0
-22598 -22599  22600 -474 -22602 0
-22598 -22599  22600 -474  22603 0

c  -1+1 --> 0
c    ( b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0 ∧  p_474) -> (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧ -b^{237, 3}_0)
c  in CNF:
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_2
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_1
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_0
c  in DIMACS:
-22598  22599 -22600 -474 -22601 0
-22598  22599 -22600 -474 -22602 0
-22598  22599 -22600 -474 -22603 0

c  0+1 --> 1
c    (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧  p_474) -> (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0)
c  in CNF:
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_2
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_1
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨  b^{237, 3}_0
c  in DIMACS:
 22598  22599  22600 -474 -22601 0
 22598  22599  22600 -474 -22602 0
 22598  22599  22600 -474  22603 0

c  1+1 --> 2
c    (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0 ∧  p_474) -> (-b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0)
c  in CNF:
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_2
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨  b^{237, 3}_1
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ -p_474 ∨ -b^{237, 3}_0
c  in DIMACS:
 22598  22599 -22600 -474 -22601 0
 22598  22599 -22600 -474  22602 0
 22598  22599 -22600 -474 -22603 0

c  2+1 --> break 
c    (-b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧  p_474) -> break
c  in CNF:
c     b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ -p_474 ∨ break
c  in DIMACS:
 22598 -22599  22600 -474 1162 0


c  2-1 --> 1
c    (-b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧ -p_474) -> (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0)
c  in CNF:
c     b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_2
c     b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_1
c     b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨  b^{237, 3}_0
c  in DIMACS:
 22598 -22599  22600  474 -22601 0
 22598 -22599  22600  474 -22602 0
 22598 -22599  22600  474  22603 0

c  1-1 --> 0
c    (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0 ∧ -p_474) -> (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧ -b^{237, 3}_0)
c  in CNF:
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_2
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_1
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_0
c  in DIMACS:
 22598  22599 -22600  474 -22601 0
 22598  22599 -22600  474 -22602 0
 22598  22599 -22600  474 -22603 0

c  0-1 --> -1
c    (-b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧ -p_474) -> ( b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0)
c  in CNF:
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨  b^{237, 3}_2
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_1
c     b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨  b^{237, 3}_0
c  in DIMACS:
 22598  22599  22600  474  22601 0
 22598  22599  22600  474 -22602 0
 22598  22599  22600  474  22603 0

c  -1-1 --> -2
c    ( b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧  b^{237, 2}_0 ∧ -p_474) -> ( b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0)
c  in CNF:
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨  b^{237, 3}_2
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨  b^{237, 3}_1
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨  p_474 ∨ -b^{237, 3}_0
c  in DIMACS:
-22598  22599 -22600  474  22601 0
-22598  22599 -22600  474  22602 0
-22598  22599 -22600  474 -22603 0

c  -2-1 --> break 
c    ( b^{237, 2}_2 ∧  b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧ -p_474) -> break
c  in CNF:
c    -b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨  b^{237, 2}_0 ∨  p_474 ∨ break
c  in DIMACS:
-22598 -22599  22600  474 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{237, 2}_2 ∧ -b^{237, 2}_1 ∧ -b^{237, 2}_0 ∧ true) 
c  in CNF:
c    -b^{237, 2}_2 ∨  b^{237, 2}_1 ∨  b^{237, 2}_0 ∨ false 
c  in DIMACS:
-22598  22599  22600  0

c  3 does not represent an automaton state.
c    -(-b^{237, 2}_2 ∧  b^{237, 2}_1 ∧  b^{237, 2}_0 ∧ true) 
c  in CNF:
c     b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ false 
c  in DIMACS:
 22598 -22599 -22600  0
c  -3 does not represent an automaton state.
c    -( b^{237, 2}_2 ∧  b^{237, 2}_1 ∧  b^{237, 2}_0 ∧ true) 
c  in CNF:
c    -b^{237, 2}_2 ∨ -b^{237, 2}_1 ∨ -b^{237, 2}_0 ∨ false 
c  in DIMACS:
-22598 -22599 -22600  0

c i = 3
c  -2+1 --> -1
c    ( b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧  p_711) -> ( b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0)
c  in CNF:
c    -b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨  b^{237, 4}_2
c    -b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_1
c    -b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨  b^{237, 4}_0
c  in DIMACS:
-22601 -22602  22603 -711  22604 0
-22601 -22602  22603 -711 -22605 0
-22601 -22602  22603 -711  22606 0

c  -1+1 --> 0
c    ( b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0 ∧  p_711) -> (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧ -b^{237, 4}_0)
c  in CNF:
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_2
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_1
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_0
c  in DIMACS:
-22601  22602 -22603 -711 -22604 0
-22601  22602 -22603 -711 -22605 0
-22601  22602 -22603 -711 -22606 0

c  0+1 --> 1
c    (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧  p_711) -> (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0)
c  in CNF:
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_2
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_1
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨  b^{237, 4}_0
c  in DIMACS:
 22601  22602  22603 -711 -22604 0
 22601  22602  22603 -711 -22605 0
 22601  22602  22603 -711  22606 0

c  1+1 --> 2
c    (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0 ∧  p_711) -> (-b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0)
c  in CNF:
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_2
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨  b^{237, 4}_1
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ -p_711 ∨ -b^{237, 4}_0
c  in DIMACS:
 22601  22602 -22603 -711 -22604 0
 22601  22602 -22603 -711  22605 0
 22601  22602 -22603 -711 -22606 0

c  2+1 --> break 
c    (-b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧  p_711) -> break
c  in CNF:
c     b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ -p_711 ∨ break
c  in DIMACS:
 22601 -22602  22603 -711 1162 0


c  2-1 --> 1
c    (-b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧ -p_711) -> (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0)
c  in CNF:
c     b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_2
c     b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_1
c     b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨  b^{237, 4}_0
c  in DIMACS:
 22601 -22602  22603  711 -22604 0
 22601 -22602  22603  711 -22605 0
 22601 -22602  22603  711  22606 0

c  1-1 --> 0
c    (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0 ∧ -p_711) -> (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧ -b^{237, 4}_0)
c  in CNF:
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_2
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_1
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_0
c  in DIMACS:
 22601  22602 -22603  711 -22604 0
 22601  22602 -22603  711 -22605 0
 22601  22602 -22603  711 -22606 0

c  0-1 --> -1
c    (-b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧ -p_711) -> ( b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0)
c  in CNF:
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨  b^{237, 4}_2
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_1
c     b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨  b^{237, 4}_0
c  in DIMACS:
 22601  22602  22603  711  22604 0
 22601  22602  22603  711 -22605 0
 22601  22602  22603  711  22606 0

c  -1-1 --> -2
c    ( b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧  b^{237, 3}_0 ∧ -p_711) -> ( b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0)
c  in CNF:
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨  b^{237, 4}_2
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨  b^{237, 4}_1
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨  p_711 ∨ -b^{237, 4}_0
c  in DIMACS:
-22601  22602 -22603  711  22604 0
-22601  22602 -22603  711  22605 0
-22601  22602 -22603  711 -22606 0

c  -2-1 --> break 
c    ( b^{237, 3}_2 ∧  b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧ -p_711) -> break
c  in CNF:
c    -b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨  b^{237, 3}_0 ∨  p_711 ∨ break
c  in DIMACS:
-22601 -22602  22603  711 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{237, 3}_2 ∧ -b^{237, 3}_1 ∧ -b^{237, 3}_0 ∧ true) 
c  in CNF:
c    -b^{237, 3}_2 ∨  b^{237, 3}_1 ∨  b^{237, 3}_0 ∨ false 
c  in DIMACS:
-22601  22602  22603  0

c  3 does not represent an automaton state.
c    -(-b^{237, 3}_2 ∧  b^{237, 3}_1 ∧  b^{237, 3}_0 ∧ true) 
c  in CNF:
c     b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ false 
c  in DIMACS:
 22601 -22602 -22603  0
c  -3 does not represent an automaton state.
c    -( b^{237, 3}_2 ∧  b^{237, 3}_1 ∧  b^{237, 3}_0 ∧ true) 
c  in CNF:
c    -b^{237, 3}_2 ∨ -b^{237, 3}_1 ∨ -b^{237, 3}_0 ∨ false 
c  in DIMACS:
-22601 -22602 -22603  0

c i = 4
c  -2+1 --> -1
c    ( b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧  p_948) -> ( b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧  b^{237, 5}_0)
c  in CNF:
c    -b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨  b^{237, 5}_2
c    -b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_1
c    -b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨  b^{237, 5}_0
c  in DIMACS:
-22604 -22605  22606 -948  22607 0
-22604 -22605  22606 -948 -22608 0
-22604 -22605  22606 -948  22609 0

c  -1+1 --> 0
c    ( b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0 ∧  p_948) -> (-b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧ -b^{237, 5}_0)
c  in CNF:
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_2
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_1
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_0
c  in DIMACS:
-22604  22605 -22606 -948 -22607 0
-22604  22605 -22606 -948 -22608 0
-22604  22605 -22606 -948 -22609 0

c  0+1 --> 1
c    (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧  p_948) -> (-b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧  b^{237, 5}_0)
c  in CNF:
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_2
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_1
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨  b^{237, 5}_0
c  in DIMACS:
 22604  22605  22606 -948 -22607 0
 22604  22605  22606 -948 -22608 0
 22604  22605  22606 -948  22609 0

c  1+1 --> 2
c    (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0 ∧  p_948) -> (-b^{237, 5}_2 ∧  b^{237, 5}_1 ∧ -b^{237, 5}_0)
c  in CNF:
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_2
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨  b^{237, 5}_1
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ -p_948 ∨ -b^{237, 5}_0
c  in DIMACS:
 22604  22605 -22606 -948 -22607 0
 22604  22605 -22606 -948  22608 0
 22604  22605 -22606 -948 -22609 0

c  2+1 --> break 
c    (-b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧  p_948) -> break
c  in CNF:
c     b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 22604 -22605  22606 -948 1162 0


c  2-1 --> 1
c    (-b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧ -p_948) -> (-b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧  b^{237, 5}_0)
c  in CNF:
c     b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_2
c     b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_1
c     b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨  b^{237, 5}_0
c  in DIMACS:
 22604 -22605  22606  948 -22607 0
 22604 -22605  22606  948 -22608 0
 22604 -22605  22606  948  22609 0

c  1-1 --> 0
c    (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0 ∧ -p_948) -> (-b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧ -b^{237, 5}_0)
c  in CNF:
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_2
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_1
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_0
c  in DIMACS:
 22604  22605 -22606  948 -22607 0
 22604  22605 -22606  948 -22608 0
 22604  22605 -22606  948 -22609 0

c  0-1 --> -1
c    (-b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧ -p_948) -> ( b^{237, 5}_2 ∧ -b^{237, 5}_1 ∧  b^{237, 5}_0)
c  in CNF:
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨  b^{237, 5}_2
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_1
c     b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨  b^{237, 5}_0
c  in DIMACS:
 22604  22605  22606  948  22607 0
 22604  22605  22606  948 -22608 0
 22604  22605  22606  948  22609 0

c  -1-1 --> -2
c    ( b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧  b^{237, 4}_0 ∧ -p_948) -> ( b^{237, 5}_2 ∧  b^{237, 5}_1 ∧ -b^{237, 5}_0)
c  in CNF:
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨  b^{237, 5}_2
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨  b^{237, 5}_1
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨  p_948 ∨ -b^{237, 5}_0
c  in DIMACS:
-22604  22605 -22606  948  22607 0
-22604  22605 -22606  948  22608 0
-22604  22605 -22606  948 -22609 0

c  -2-1 --> break 
c    ( b^{237, 4}_2 ∧  b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨  b^{237, 4}_0 ∨  p_948 ∨ break
c  in DIMACS:
-22604 -22605  22606  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{237, 4}_2 ∧ -b^{237, 4}_1 ∧ -b^{237, 4}_0 ∧ true) 
c  in CNF:
c    -b^{237, 4}_2 ∨  b^{237, 4}_1 ∨  b^{237, 4}_0 ∨ false 
c  in DIMACS:
-22604  22605  22606  0

c  3 does not represent an automaton state.
c    -(-b^{237, 4}_2 ∧  b^{237, 4}_1 ∧  b^{237, 4}_0 ∧ true) 
c  in CNF:
c     b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ false 
c  in DIMACS:
 22604 -22605 -22606  0
c  -3 does not represent an automaton state.
c    -( b^{237, 4}_2 ∧  b^{237, 4}_1 ∧  b^{237, 4}_0 ∧ true) 
c  in CNF:
c    -b^{237, 4}_2 ∨ -b^{237, 4}_1 ∨ -b^{237, 4}_0 ∨ false 
c  in DIMACS:
-22604 -22605 -22606  0

c INIT for k = 238
c    -b^{238, 1}_2
c    -b^{238, 1}_1
c    -b^{238, 1}_0
c  in DIMACS:
-22610 0
-22611 0
-22612 0

c Transitions for k = 238
c i = 1
c  -2+1 --> -1
c    ( b^{238, 1}_2 ∧  b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧  p_238) -> ( b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0)
c  in CNF:
c    -b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨  b^{238, 2}_2
c    -b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_1
c    -b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨  b^{238, 2}_0
c  in DIMACS:
-22610 -22611  22612 -238  22613 0
-22610 -22611  22612 -238 -22614 0
-22610 -22611  22612 -238  22615 0

c  -1+1 --> 0
c    ( b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧  b^{238, 1}_0 ∧  p_238) -> (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧ -b^{238, 2}_0)
c  in CNF:
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_2
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_1
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_0
c  in DIMACS:
-22610  22611 -22612 -238 -22613 0
-22610  22611 -22612 -238 -22614 0
-22610  22611 -22612 -238 -22615 0

c  0+1 --> 1
c    (-b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧  p_238) -> (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0)
c  in CNF:
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_2
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_1
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨  b^{238, 2}_0
c  in DIMACS:
 22610  22611  22612 -238 -22613 0
 22610  22611  22612 -238 -22614 0
 22610  22611  22612 -238  22615 0

c  1+1 --> 2
c    (-b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧  b^{238, 1}_0 ∧  p_238) -> (-b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0)
c  in CNF:
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_2
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨  b^{238, 2}_1
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ -p_238 ∨ -b^{238, 2}_0
c  in DIMACS:
 22610  22611 -22612 -238 -22613 0
 22610  22611 -22612 -238  22614 0
 22610  22611 -22612 -238 -22615 0

c  2+1 --> break 
c    (-b^{238, 1}_2 ∧  b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧  p_238) -> break
c  in CNF:
c     b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ -p_238 ∨ break
c  in DIMACS:
 22610 -22611  22612 -238 1162 0


c  2-1 --> 1
c    (-b^{238, 1}_2 ∧  b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧ -p_238) -> (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0)
c  in CNF:
c     b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_2
c     b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_1
c     b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨  b^{238, 2}_0
c  in DIMACS:
 22610 -22611  22612  238 -22613 0
 22610 -22611  22612  238 -22614 0
 22610 -22611  22612  238  22615 0

c  1-1 --> 0
c    (-b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧  b^{238, 1}_0 ∧ -p_238) -> (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧ -b^{238, 2}_0)
c  in CNF:
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_2
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_1
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_0
c  in DIMACS:
 22610  22611 -22612  238 -22613 0
 22610  22611 -22612  238 -22614 0
 22610  22611 -22612  238 -22615 0

c  0-1 --> -1
c    (-b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧ -p_238) -> ( b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0)
c  in CNF:
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨  b^{238, 2}_2
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_1
c     b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨  b^{238, 2}_0
c  in DIMACS:
 22610  22611  22612  238  22613 0
 22610  22611  22612  238 -22614 0
 22610  22611  22612  238  22615 0

c  -1-1 --> -2
c    ( b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧  b^{238, 1}_0 ∧ -p_238) -> ( b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0)
c  in CNF:
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨  b^{238, 2}_2
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨  b^{238, 2}_1
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨  p_238 ∨ -b^{238, 2}_0
c  in DIMACS:
-22610  22611 -22612  238  22613 0
-22610  22611 -22612  238  22614 0
-22610  22611 -22612  238 -22615 0

c  -2-1 --> break 
c    ( b^{238, 1}_2 ∧  b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧ -p_238) -> break
c  in CNF:
c    -b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨  b^{238, 1}_0 ∨  p_238 ∨ break
c  in DIMACS:
-22610 -22611  22612  238 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{238, 1}_2 ∧ -b^{238, 1}_1 ∧ -b^{238, 1}_0 ∧ true) 
c  in CNF:
c    -b^{238, 1}_2 ∨  b^{238, 1}_1 ∨  b^{238, 1}_0 ∨ false 
c  in DIMACS:
-22610  22611  22612  0

c  3 does not represent an automaton state.
c    -(-b^{238, 1}_2 ∧  b^{238, 1}_1 ∧  b^{238, 1}_0 ∧ true) 
c  in CNF:
c     b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ false 
c  in DIMACS:
 22610 -22611 -22612  0
c  -3 does not represent an automaton state.
c    -( b^{238, 1}_2 ∧  b^{238, 1}_1 ∧  b^{238, 1}_0 ∧ true) 
c  in CNF:
c    -b^{238, 1}_2 ∨ -b^{238, 1}_1 ∨ -b^{238, 1}_0 ∨ false 
c  in DIMACS:
-22610 -22611 -22612  0

c i = 2
c  -2+1 --> -1
c    ( b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧  p_476) -> ( b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0)
c  in CNF:
c    -b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨  b^{238, 3}_2
c    -b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_1
c    -b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨  b^{238, 3}_0
c  in DIMACS:
-22613 -22614  22615 -476  22616 0
-22613 -22614  22615 -476 -22617 0
-22613 -22614  22615 -476  22618 0

c  -1+1 --> 0
c    ( b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0 ∧  p_476) -> (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧ -b^{238, 3}_0)
c  in CNF:
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_2
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_1
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_0
c  in DIMACS:
-22613  22614 -22615 -476 -22616 0
-22613  22614 -22615 -476 -22617 0
-22613  22614 -22615 -476 -22618 0

c  0+1 --> 1
c    (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧  p_476) -> (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0)
c  in CNF:
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_2
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_1
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨  b^{238, 3}_0
c  in DIMACS:
 22613  22614  22615 -476 -22616 0
 22613  22614  22615 -476 -22617 0
 22613  22614  22615 -476  22618 0

c  1+1 --> 2
c    (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0 ∧  p_476) -> (-b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0)
c  in CNF:
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_2
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨  b^{238, 3}_1
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ -p_476 ∨ -b^{238, 3}_0
c  in DIMACS:
 22613  22614 -22615 -476 -22616 0
 22613  22614 -22615 -476  22617 0
 22613  22614 -22615 -476 -22618 0

c  2+1 --> break 
c    (-b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧  p_476) -> break
c  in CNF:
c     b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ -p_476 ∨ break
c  in DIMACS:
 22613 -22614  22615 -476 1162 0


c  2-1 --> 1
c    (-b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧ -p_476) -> (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0)
c  in CNF:
c     b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_2
c     b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_1
c     b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨  b^{238, 3}_0
c  in DIMACS:
 22613 -22614  22615  476 -22616 0
 22613 -22614  22615  476 -22617 0
 22613 -22614  22615  476  22618 0

c  1-1 --> 0
c    (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0 ∧ -p_476) -> (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧ -b^{238, 3}_0)
c  in CNF:
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_2
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_1
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_0
c  in DIMACS:
 22613  22614 -22615  476 -22616 0
 22613  22614 -22615  476 -22617 0
 22613  22614 -22615  476 -22618 0

c  0-1 --> -1
c    (-b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧ -p_476) -> ( b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0)
c  in CNF:
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨  b^{238, 3}_2
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_1
c     b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨  b^{238, 3}_0
c  in DIMACS:
 22613  22614  22615  476  22616 0
 22613  22614  22615  476 -22617 0
 22613  22614  22615  476  22618 0

c  -1-1 --> -2
c    ( b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧  b^{238, 2}_0 ∧ -p_476) -> ( b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0)
c  in CNF:
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨  b^{238, 3}_2
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨  b^{238, 3}_1
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨  p_476 ∨ -b^{238, 3}_0
c  in DIMACS:
-22613  22614 -22615  476  22616 0
-22613  22614 -22615  476  22617 0
-22613  22614 -22615  476 -22618 0

c  -2-1 --> break 
c    ( b^{238, 2}_2 ∧  b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧ -p_476) -> break
c  in CNF:
c    -b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨  b^{238, 2}_0 ∨  p_476 ∨ break
c  in DIMACS:
-22613 -22614  22615  476 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{238, 2}_2 ∧ -b^{238, 2}_1 ∧ -b^{238, 2}_0 ∧ true) 
c  in CNF:
c    -b^{238, 2}_2 ∨  b^{238, 2}_1 ∨  b^{238, 2}_0 ∨ false 
c  in DIMACS:
-22613  22614  22615  0

c  3 does not represent an automaton state.
c    -(-b^{238, 2}_2 ∧  b^{238, 2}_1 ∧  b^{238, 2}_0 ∧ true) 
c  in CNF:
c     b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ false 
c  in DIMACS:
 22613 -22614 -22615  0
c  -3 does not represent an automaton state.
c    -( b^{238, 2}_2 ∧  b^{238, 2}_1 ∧  b^{238, 2}_0 ∧ true) 
c  in CNF:
c    -b^{238, 2}_2 ∨ -b^{238, 2}_1 ∨ -b^{238, 2}_0 ∨ false 
c  in DIMACS:
-22613 -22614 -22615  0

c i = 3
c  -2+1 --> -1
c    ( b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧  p_714) -> ( b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0)
c  in CNF:
c    -b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨  b^{238, 4}_2
c    -b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_1
c    -b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨  b^{238, 4}_0
c  in DIMACS:
-22616 -22617  22618 -714  22619 0
-22616 -22617  22618 -714 -22620 0
-22616 -22617  22618 -714  22621 0

c  -1+1 --> 0
c    ( b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0 ∧  p_714) -> (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧ -b^{238, 4}_0)
c  in CNF:
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_2
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_1
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_0
c  in DIMACS:
-22616  22617 -22618 -714 -22619 0
-22616  22617 -22618 -714 -22620 0
-22616  22617 -22618 -714 -22621 0

c  0+1 --> 1
c    (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧  p_714) -> (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0)
c  in CNF:
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_2
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_1
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨  b^{238, 4}_0
c  in DIMACS:
 22616  22617  22618 -714 -22619 0
 22616  22617  22618 -714 -22620 0
 22616  22617  22618 -714  22621 0

c  1+1 --> 2
c    (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0 ∧  p_714) -> (-b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0)
c  in CNF:
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_2
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨  b^{238, 4}_1
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ -p_714 ∨ -b^{238, 4}_0
c  in DIMACS:
 22616  22617 -22618 -714 -22619 0
 22616  22617 -22618 -714  22620 0
 22616  22617 -22618 -714 -22621 0

c  2+1 --> break 
c    (-b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧  p_714) -> break
c  in CNF:
c     b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 22616 -22617  22618 -714 1162 0


c  2-1 --> 1
c    (-b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧ -p_714) -> (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0)
c  in CNF:
c     b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_2
c     b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_1
c     b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨  b^{238, 4}_0
c  in DIMACS:
 22616 -22617  22618  714 -22619 0
 22616 -22617  22618  714 -22620 0
 22616 -22617  22618  714  22621 0

c  1-1 --> 0
c    (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0 ∧ -p_714) -> (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧ -b^{238, 4}_0)
c  in CNF:
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_2
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_1
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_0
c  in DIMACS:
 22616  22617 -22618  714 -22619 0
 22616  22617 -22618  714 -22620 0
 22616  22617 -22618  714 -22621 0

c  0-1 --> -1
c    (-b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧ -p_714) -> ( b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0)
c  in CNF:
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨  b^{238, 4}_2
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_1
c     b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨  b^{238, 4}_0
c  in DIMACS:
 22616  22617  22618  714  22619 0
 22616  22617  22618  714 -22620 0
 22616  22617  22618  714  22621 0

c  -1-1 --> -2
c    ( b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧  b^{238, 3}_0 ∧ -p_714) -> ( b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0)
c  in CNF:
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨  b^{238, 4}_2
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨  b^{238, 4}_1
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨  p_714 ∨ -b^{238, 4}_0
c  in DIMACS:
-22616  22617 -22618  714  22619 0
-22616  22617 -22618  714  22620 0
-22616  22617 -22618  714 -22621 0

c  -2-1 --> break 
c    ( b^{238, 3}_2 ∧  b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨  b^{238, 3}_0 ∨  p_714 ∨ break
c  in DIMACS:
-22616 -22617  22618  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{238, 3}_2 ∧ -b^{238, 3}_1 ∧ -b^{238, 3}_0 ∧ true) 
c  in CNF:
c    -b^{238, 3}_2 ∨  b^{238, 3}_1 ∨  b^{238, 3}_0 ∨ false 
c  in DIMACS:
-22616  22617  22618  0

c  3 does not represent an automaton state.
c    -(-b^{238, 3}_2 ∧  b^{238, 3}_1 ∧  b^{238, 3}_0 ∧ true) 
c  in CNF:
c     b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ false 
c  in DIMACS:
 22616 -22617 -22618  0
c  -3 does not represent an automaton state.
c    -( b^{238, 3}_2 ∧  b^{238, 3}_1 ∧  b^{238, 3}_0 ∧ true) 
c  in CNF:
c    -b^{238, 3}_2 ∨ -b^{238, 3}_1 ∨ -b^{238, 3}_0 ∨ false 
c  in DIMACS:
-22616 -22617 -22618  0

c i = 4
c  -2+1 --> -1
c    ( b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧  p_952) -> ( b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧  b^{238, 5}_0)
c  in CNF:
c    -b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨  b^{238, 5}_2
c    -b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_1
c    -b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨  b^{238, 5}_0
c  in DIMACS:
-22619 -22620  22621 -952  22622 0
-22619 -22620  22621 -952 -22623 0
-22619 -22620  22621 -952  22624 0

c  -1+1 --> 0
c    ( b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0 ∧  p_952) -> (-b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧ -b^{238, 5}_0)
c  in CNF:
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_2
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_1
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_0
c  in DIMACS:
-22619  22620 -22621 -952 -22622 0
-22619  22620 -22621 -952 -22623 0
-22619  22620 -22621 -952 -22624 0

c  0+1 --> 1
c    (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧  p_952) -> (-b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧  b^{238, 5}_0)
c  in CNF:
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_2
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_1
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨  b^{238, 5}_0
c  in DIMACS:
 22619  22620  22621 -952 -22622 0
 22619  22620  22621 -952 -22623 0
 22619  22620  22621 -952  22624 0

c  1+1 --> 2
c    (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0 ∧  p_952) -> (-b^{238, 5}_2 ∧  b^{238, 5}_1 ∧ -b^{238, 5}_0)
c  in CNF:
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_2
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨  b^{238, 5}_1
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ -p_952 ∨ -b^{238, 5}_0
c  in DIMACS:
 22619  22620 -22621 -952 -22622 0
 22619  22620 -22621 -952  22623 0
 22619  22620 -22621 -952 -22624 0

c  2+1 --> break 
c    (-b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧  p_952) -> break
c  in CNF:
c     b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ -p_952 ∨ break
c  in DIMACS:
 22619 -22620  22621 -952 1162 0


c  2-1 --> 1
c    (-b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧ -p_952) -> (-b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧  b^{238, 5}_0)
c  in CNF:
c     b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_2
c     b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_1
c     b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨  b^{238, 5}_0
c  in DIMACS:
 22619 -22620  22621  952 -22622 0
 22619 -22620  22621  952 -22623 0
 22619 -22620  22621  952  22624 0

c  1-1 --> 0
c    (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0 ∧ -p_952) -> (-b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧ -b^{238, 5}_0)
c  in CNF:
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_2
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_1
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_0
c  in DIMACS:
 22619  22620 -22621  952 -22622 0
 22619  22620 -22621  952 -22623 0
 22619  22620 -22621  952 -22624 0

c  0-1 --> -1
c    (-b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧ -p_952) -> ( b^{238, 5}_2 ∧ -b^{238, 5}_1 ∧  b^{238, 5}_0)
c  in CNF:
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨  b^{238, 5}_2
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_1
c     b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨  b^{238, 5}_0
c  in DIMACS:
 22619  22620  22621  952  22622 0
 22619  22620  22621  952 -22623 0
 22619  22620  22621  952  22624 0

c  -1-1 --> -2
c    ( b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧  b^{238, 4}_0 ∧ -p_952) -> ( b^{238, 5}_2 ∧  b^{238, 5}_1 ∧ -b^{238, 5}_0)
c  in CNF:
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨  b^{238, 5}_2
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨  b^{238, 5}_1
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨  p_952 ∨ -b^{238, 5}_0
c  in DIMACS:
-22619  22620 -22621  952  22622 0
-22619  22620 -22621  952  22623 0
-22619  22620 -22621  952 -22624 0

c  -2-1 --> break 
c    ( b^{238, 4}_2 ∧  b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧ -p_952) -> break
c  in CNF:
c    -b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨  b^{238, 4}_0 ∨  p_952 ∨ break
c  in DIMACS:
-22619 -22620  22621  952 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{238, 4}_2 ∧ -b^{238, 4}_1 ∧ -b^{238, 4}_0 ∧ true) 
c  in CNF:
c    -b^{238, 4}_2 ∨  b^{238, 4}_1 ∨  b^{238, 4}_0 ∨ false 
c  in DIMACS:
-22619  22620  22621  0

c  3 does not represent an automaton state.
c    -(-b^{238, 4}_2 ∧  b^{238, 4}_1 ∧  b^{238, 4}_0 ∧ true) 
c  in CNF:
c     b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ false 
c  in DIMACS:
 22619 -22620 -22621  0
c  -3 does not represent an automaton state.
c    -( b^{238, 4}_2 ∧  b^{238, 4}_1 ∧  b^{238, 4}_0 ∧ true) 
c  in CNF:
c    -b^{238, 4}_2 ∨ -b^{238, 4}_1 ∨ -b^{238, 4}_0 ∨ false 
c  in DIMACS:
-22619 -22620 -22621  0

c INIT for k = 239
c    -b^{239, 1}_2
c    -b^{239, 1}_1
c    -b^{239, 1}_0
c  in DIMACS:
-22625 0
-22626 0
-22627 0

c Transitions for k = 239
c i = 1
c  -2+1 --> -1
c    ( b^{239, 1}_2 ∧  b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧  p_239) -> ( b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0)
c  in CNF:
c    -b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨  b^{239, 2}_2
c    -b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_1
c    -b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨  b^{239, 2}_0
c  in DIMACS:
-22625 -22626  22627 -239  22628 0
-22625 -22626  22627 -239 -22629 0
-22625 -22626  22627 -239  22630 0

c  -1+1 --> 0
c    ( b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧  b^{239, 1}_0 ∧  p_239) -> (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧ -b^{239, 2}_0)
c  in CNF:
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_2
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_1
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_0
c  in DIMACS:
-22625  22626 -22627 -239 -22628 0
-22625  22626 -22627 -239 -22629 0
-22625  22626 -22627 -239 -22630 0

c  0+1 --> 1
c    (-b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧  p_239) -> (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0)
c  in CNF:
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_2
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_1
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨  b^{239, 2}_0
c  in DIMACS:
 22625  22626  22627 -239 -22628 0
 22625  22626  22627 -239 -22629 0
 22625  22626  22627 -239  22630 0

c  1+1 --> 2
c    (-b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧  b^{239, 1}_0 ∧  p_239) -> (-b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0)
c  in CNF:
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_2
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨  b^{239, 2}_1
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ -p_239 ∨ -b^{239, 2}_0
c  in DIMACS:
 22625  22626 -22627 -239 -22628 0
 22625  22626 -22627 -239  22629 0
 22625  22626 -22627 -239 -22630 0

c  2+1 --> break 
c    (-b^{239, 1}_2 ∧  b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧  p_239) -> break
c  in CNF:
c     b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ -p_239 ∨ break
c  in DIMACS:
 22625 -22626  22627 -239 1162 0


c  2-1 --> 1
c    (-b^{239, 1}_2 ∧  b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧ -p_239) -> (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0)
c  in CNF:
c     b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_2
c     b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_1
c     b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨  b^{239, 2}_0
c  in DIMACS:
 22625 -22626  22627  239 -22628 0
 22625 -22626  22627  239 -22629 0
 22625 -22626  22627  239  22630 0

c  1-1 --> 0
c    (-b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧  b^{239, 1}_0 ∧ -p_239) -> (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧ -b^{239, 2}_0)
c  in CNF:
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_2
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_1
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_0
c  in DIMACS:
 22625  22626 -22627  239 -22628 0
 22625  22626 -22627  239 -22629 0
 22625  22626 -22627  239 -22630 0

c  0-1 --> -1
c    (-b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧ -p_239) -> ( b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0)
c  in CNF:
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨  b^{239, 2}_2
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_1
c     b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨  b^{239, 2}_0
c  in DIMACS:
 22625  22626  22627  239  22628 0
 22625  22626  22627  239 -22629 0
 22625  22626  22627  239  22630 0

c  -1-1 --> -2
c    ( b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧  b^{239, 1}_0 ∧ -p_239) -> ( b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0)
c  in CNF:
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨  b^{239, 2}_2
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨  b^{239, 2}_1
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨  p_239 ∨ -b^{239, 2}_0
c  in DIMACS:
-22625  22626 -22627  239  22628 0
-22625  22626 -22627  239  22629 0
-22625  22626 -22627  239 -22630 0

c  -2-1 --> break 
c    ( b^{239, 1}_2 ∧  b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧ -p_239) -> break
c  in CNF:
c    -b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨  b^{239, 1}_0 ∨  p_239 ∨ break
c  in DIMACS:
-22625 -22626  22627  239 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{239, 1}_2 ∧ -b^{239, 1}_1 ∧ -b^{239, 1}_0 ∧ true) 
c  in CNF:
c    -b^{239, 1}_2 ∨  b^{239, 1}_1 ∨  b^{239, 1}_0 ∨ false 
c  in DIMACS:
-22625  22626  22627  0

c  3 does not represent an automaton state.
c    -(-b^{239, 1}_2 ∧  b^{239, 1}_1 ∧  b^{239, 1}_0 ∧ true) 
c  in CNF:
c     b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ false 
c  in DIMACS:
 22625 -22626 -22627  0
c  -3 does not represent an automaton state.
c    -( b^{239, 1}_2 ∧  b^{239, 1}_1 ∧  b^{239, 1}_0 ∧ true) 
c  in CNF:
c    -b^{239, 1}_2 ∨ -b^{239, 1}_1 ∨ -b^{239, 1}_0 ∨ false 
c  in DIMACS:
-22625 -22626 -22627  0

c i = 2
c  -2+1 --> -1
c    ( b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧  p_478) -> ( b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0)
c  in CNF:
c    -b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨  b^{239, 3}_2
c    -b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_1
c    -b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨  b^{239, 3}_0
c  in DIMACS:
-22628 -22629  22630 -478  22631 0
-22628 -22629  22630 -478 -22632 0
-22628 -22629  22630 -478  22633 0

c  -1+1 --> 0
c    ( b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0 ∧  p_478) -> (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧ -b^{239, 3}_0)
c  in CNF:
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_2
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_1
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_0
c  in DIMACS:
-22628  22629 -22630 -478 -22631 0
-22628  22629 -22630 -478 -22632 0
-22628  22629 -22630 -478 -22633 0

c  0+1 --> 1
c    (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧  p_478) -> (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0)
c  in CNF:
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_2
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_1
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨  b^{239, 3}_0
c  in DIMACS:
 22628  22629  22630 -478 -22631 0
 22628  22629  22630 -478 -22632 0
 22628  22629  22630 -478  22633 0

c  1+1 --> 2
c    (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0 ∧  p_478) -> (-b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0)
c  in CNF:
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_2
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨  b^{239, 3}_1
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ -p_478 ∨ -b^{239, 3}_0
c  in DIMACS:
 22628  22629 -22630 -478 -22631 0
 22628  22629 -22630 -478  22632 0
 22628  22629 -22630 -478 -22633 0

c  2+1 --> break 
c    (-b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧  p_478) -> break
c  in CNF:
c     b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ -p_478 ∨ break
c  in DIMACS:
 22628 -22629  22630 -478 1162 0


c  2-1 --> 1
c    (-b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧ -p_478) -> (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0)
c  in CNF:
c     b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_2
c     b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_1
c     b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨  b^{239, 3}_0
c  in DIMACS:
 22628 -22629  22630  478 -22631 0
 22628 -22629  22630  478 -22632 0
 22628 -22629  22630  478  22633 0

c  1-1 --> 0
c    (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0 ∧ -p_478) -> (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧ -b^{239, 3}_0)
c  in CNF:
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_2
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_1
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_0
c  in DIMACS:
 22628  22629 -22630  478 -22631 0
 22628  22629 -22630  478 -22632 0
 22628  22629 -22630  478 -22633 0

c  0-1 --> -1
c    (-b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧ -p_478) -> ( b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0)
c  in CNF:
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨  b^{239, 3}_2
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_1
c     b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨  b^{239, 3}_0
c  in DIMACS:
 22628  22629  22630  478  22631 0
 22628  22629  22630  478 -22632 0
 22628  22629  22630  478  22633 0

c  -1-1 --> -2
c    ( b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧  b^{239, 2}_0 ∧ -p_478) -> ( b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0)
c  in CNF:
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨  b^{239, 3}_2
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨  b^{239, 3}_1
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨  p_478 ∨ -b^{239, 3}_0
c  in DIMACS:
-22628  22629 -22630  478  22631 0
-22628  22629 -22630  478  22632 0
-22628  22629 -22630  478 -22633 0

c  -2-1 --> break 
c    ( b^{239, 2}_2 ∧  b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧ -p_478) -> break
c  in CNF:
c    -b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨  b^{239, 2}_0 ∨  p_478 ∨ break
c  in DIMACS:
-22628 -22629  22630  478 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{239, 2}_2 ∧ -b^{239, 2}_1 ∧ -b^{239, 2}_0 ∧ true) 
c  in CNF:
c    -b^{239, 2}_2 ∨  b^{239, 2}_1 ∨  b^{239, 2}_0 ∨ false 
c  in DIMACS:
-22628  22629  22630  0

c  3 does not represent an automaton state.
c    -(-b^{239, 2}_2 ∧  b^{239, 2}_1 ∧  b^{239, 2}_0 ∧ true) 
c  in CNF:
c     b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ false 
c  in DIMACS:
 22628 -22629 -22630  0
c  -3 does not represent an automaton state.
c    -( b^{239, 2}_2 ∧  b^{239, 2}_1 ∧  b^{239, 2}_0 ∧ true) 
c  in CNF:
c    -b^{239, 2}_2 ∨ -b^{239, 2}_1 ∨ -b^{239, 2}_0 ∨ false 
c  in DIMACS:
-22628 -22629 -22630  0

c i = 3
c  -2+1 --> -1
c    ( b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧  p_717) -> ( b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0)
c  in CNF:
c    -b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨  b^{239, 4}_2
c    -b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_1
c    -b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨  b^{239, 4}_0
c  in DIMACS:
-22631 -22632  22633 -717  22634 0
-22631 -22632  22633 -717 -22635 0
-22631 -22632  22633 -717  22636 0

c  -1+1 --> 0
c    ( b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0 ∧  p_717) -> (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧ -b^{239, 4}_0)
c  in CNF:
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_2
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_1
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_0
c  in DIMACS:
-22631  22632 -22633 -717 -22634 0
-22631  22632 -22633 -717 -22635 0
-22631  22632 -22633 -717 -22636 0

c  0+1 --> 1
c    (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧  p_717) -> (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0)
c  in CNF:
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_2
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_1
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨  b^{239, 4}_0
c  in DIMACS:
 22631  22632  22633 -717 -22634 0
 22631  22632  22633 -717 -22635 0
 22631  22632  22633 -717  22636 0

c  1+1 --> 2
c    (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0 ∧  p_717) -> (-b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0)
c  in CNF:
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_2
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨  b^{239, 4}_1
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ -p_717 ∨ -b^{239, 4}_0
c  in DIMACS:
 22631  22632 -22633 -717 -22634 0
 22631  22632 -22633 -717  22635 0
 22631  22632 -22633 -717 -22636 0

c  2+1 --> break 
c    (-b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧  p_717) -> break
c  in CNF:
c     b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ -p_717 ∨ break
c  in DIMACS:
 22631 -22632  22633 -717 1162 0


c  2-1 --> 1
c    (-b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧ -p_717) -> (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0)
c  in CNF:
c     b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_2
c     b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_1
c     b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨  b^{239, 4}_0
c  in DIMACS:
 22631 -22632  22633  717 -22634 0
 22631 -22632  22633  717 -22635 0
 22631 -22632  22633  717  22636 0

c  1-1 --> 0
c    (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0 ∧ -p_717) -> (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧ -b^{239, 4}_0)
c  in CNF:
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_2
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_1
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_0
c  in DIMACS:
 22631  22632 -22633  717 -22634 0
 22631  22632 -22633  717 -22635 0
 22631  22632 -22633  717 -22636 0

c  0-1 --> -1
c    (-b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧ -p_717) -> ( b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0)
c  in CNF:
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨  b^{239, 4}_2
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_1
c     b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨  b^{239, 4}_0
c  in DIMACS:
 22631  22632  22633  717  22634 0
 22631  22632  22633  717 -22635 0
 22631  22632  22633  717  22636 0

c  -1-1 --> -2
c    ( b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧  b^{239, 3}_0 ∧ -p_717) -> ( b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0)
c  in CNF:
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨  b^{239, 4}_2
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨  b^{239, 4}_1
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨  p_717 ∨ -b^{239, 4}_0
c  in DIMACS:
-22631  22632 -22633  717  22634 0
-22631  22632 -22633  717  22635 0
-22631  22632 -22633  717 -22636 0

c  -2-1 --> break 
c    ( b^{239, 3}_2 ∧  b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧ -p_717) -> break
c  in CNF:
c    -b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨  b^{239, 3}_0 ∨  p_717 ∨ break
c  in DIMACS:
-22631 -22632  22633  717 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{239, 3}_2 ∧ -b^{239, 3}_1 ∧ -b^{239, 3}_0 ∧ true) 
c  in CNF:
c    -b^{239, 3}_2 ∨  b^{239, 3}_1 ∨  b^{239, 3}_0 ∨ false 
c  in DIMACS:
-22631  22632  22633  0

c  3 does not represent an automaton state.
c    -(-b^{239, 3}_2 ∧  b^{239, 3}_1 ∧  b^{239, 3}_0 ∧ true) 
c  in CNF:
c     b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ false 
c  in DIMACS:
 22631 -22632 -22633  0
c  -3 does not represent an automaton state.
c    -( b^{239, 3}_2 ∧  b^{239, 3}_1 ∧  b^{239, 3}_0 ∧ true) 
c  in CNF:
c    -b^{239, 3}_2 ∨ -b^{239, 3}_1 ∨ -b^{239, 3}_0 ∨ false 
c  in DIMACS:
-22631 -22632 -22633  0

c i = 4
c  -2+1 --> -1
c    ( b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧  p_956) -> ( b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧  b^{239, 5}_0)
c  in CNF:
c    -b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨  b^{239, 5}_2
c    -b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_1
c    -b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨  b^{239, 5}_0
c  in DIMACS:
-22634 -22635  22636 -956  22637 0
-22634 -22635  22636 -956 -22638 0
-22634 -22635  22636 -956  22639 0

c  -1+1 --> 0
c    ( b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0 ∧  p_956) -> (-b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧ -b^{239, 5}_0)
c  in CNF:
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_2
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_1
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_0
c  in DIMACS:
-22634  22635 -22636 -956 -22637 0
-22634  22635 -22636 -956 -22638 0
-22634  22635 -22636 -956 -22639 0

c  0+1 --> 1
c    (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧  p_956) -> (-b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧  b^{239, 5}_0)
c  in CNF:
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_2
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_1
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨  b^{239, 5}_0
c  in DIMACS:
 22634  22635  22636 -956 -22637 0
 22634  22635  22636 -956 -22638 0
 22634  22635  22636 -956  22639 0

c  1+1 --> 2
c    (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0 ∧  p_956) -> (-b^{239, 5}_2 ∧  b^{239, 5}_1 ∧ -b^{239, 5}_0)
c  in CNF:
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_2
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨  b^{239, 5}_1
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ -p_956 ∨ -b^{239, 5}_0
c  in DIMACS:
 22634  22635 -22636 -956 -22637 0
 22634  22635 -22636 -956  22638 0
 22634  22635 -22636 -956 -22639 0

c  2+1 --> break 
c    (-b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧  p_956) -> break
c  in CNF:
c     b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ -p_956 ∨ break
c  in DIMACS:
 22634 -22635  22636 -956 1162 0


c  2-1 --> 1
c    (-b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧ -p_956) -> (-b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧  b^{239, 5}_0)
c  in CNF:
c     b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_2
c     b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_1
c     b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨  b^{239, 5}_0
c  in DIMACS:
 22634 -22635  22636  956 -22637 0
 22634 -22635  22636  956 -22638 0
 22634 -22635  22636  956  22639 0

c  1-1 --> 0
c    (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0 ∧ -p_956) -> (-b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧ -b^{239, 5}_0)
c  in CNF:
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_2
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_1
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_0
c  in DIMACS:
 22634  22635 -22636  956 -22637 0
 22634  22635 -22636  956 -22638 0
 22634  22635 -22636  956 -22639 0

c  0-1 --> -1
c    (-b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧ -p_956) -> ( b^{239, 5}_2 ∧ -b^{239, 5}_1 ∧  b^{239, 5}_0)
c  in CNF:
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨  b^{239, 5}_2
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_1
c     b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨  b^{239, 5}_0
c  in DIMACS:
 22634  22635  22636  956  22637 0
 22634  22635  22636  956 -22638 0
 22634  22635  22636  956  22639 0

c  -1-1 --> -2
c    ( b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧  b^{239, 4}_0 ∧ -p_956) -> ( b^{239, 5}_2 ∧  b^{239, 5}_1 ∧ -b^{239, 5}_0)
c  in CNF:
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨  b^{239, 5}_2
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨  b^{239, 5}_1
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨  p_956 ∨ -b^{239, 5}_0
c  in DIMACS:
-22634  22635 -22636  956  22637 0
-22634  22635 -22636  956  22638 0
-22634  22635 -22636  956 -22639 0

c  -2-1 --> break 
c    ( b^{239, 4}_2 ∧  b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧ -p_956) -> break
c  in CNF:
c    -b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨  b^{239, 4}_0 ∨  p_956 ∨ break
c  in DIMACS:
-22634 -22635  22636  956 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{239, 4}_2 ∧ -b^{239, 4}_1 ∧ -b^{239, 4}_0 ∧ true) 
c  in CNF:
c    -b^{239, 4}_2 ∨  b^{239, 4}_1 ∨  b^{239, 4}_0 ∨ false 
c  in DIMACS:
-22634  22635  22636  0

c  3 does not represent an automaton state.
c    -(-b^{239, 4}_2 ∧  b^{239, 4}_1 ∧  b^{239, 4}_0 ∧ true) 
c  in CNF:
c     b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ false 
c  in DIMACS:
 22634 -22635 -22636  0
c  -3 does not represent an automaton state.
c    -( b^{239, 4}_2 ∧  b^{239, 4}_1 ∧  b^{239, 4}_0 ∧ true) 
c  in CNF:
c    -b^{239, 4}_2 ∨ -b^{239, 4}_1 ∨ -b^{239, 4}_0 ∨ false 
c  in DIMACS:
-22634 -22635 -22636  0

c INIT for k = 240
c    -b^{240, 1}_2
c    -b^{240, 1}_1
c    -b^{240, 1}_0
c  in DIMACS:
-22640 0
-22641 0
-22642 0

c Transitions for k = 240
c i = 1
c  -2+1 --> -1
c    ( b^{240, 1}_2 ∧  b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧  p_240) -> ( b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0)
c  in CNF:
c    -b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨  b^{240, 2}_2
c    -b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_1
c    -b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨  b^{240, 2}_0
c  in DIMACS:
-22640 -22641  22642 -240  22643 0
-22640 -22641  22642 -240 -22644 0
-22640 -22641  22642 -240  22645 0

c  -1+1 --> 0
c    ( b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧  b^{240, 1}_0 ∧  p_240) -> (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧ -b^{240, 2}_0)
c  in CNF:
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_2
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_1
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_0
c  in DIMACS:
-22640  22641 -22642 -240 -22643 0
-22640  22641 -22642 -240 -22644 0
-22640  22641 -22642 -240 -22645 0

c  0+1 --> 1
c    (-b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧  p_240) -> (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0)
c  in CNF:
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_2
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_1
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨  b^{240, 2}_0
c  in DIMACS:
 22640  22641  22642 -240 -22643 0
 22640  22641  22642 -240 -22644 0
 22640  22641  22642 -240  22645 0

c  1+1 --> 2
c    (-b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧  b^{240, 1}_0 ∧  p_240) -> (-b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0)
c  in CNF:
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_2
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨  b^{240, 2}_1
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ -p_240 ∨ -b^{240, 2}_0
c  in DIMACS:
 22640  22641 -22642 -240 -22643 0
 22640  22641 -22642 -240  22644 0
 22640  22641 -22642 -240 -22645 0

c  2+1 --> break 
c    (-b^{240, 1}_2 ∧  b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧  p_240) -> break
c  in CNF:
c     b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ -p_240 ∨ break
c  in DIMACS:
 22640 -22641  22642 -240 1162 0


c  2-1 --> 1
c    (-b^{240, 1}_2 ∧  b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧ -p_240) -> (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0)
c  in CNF:
c     b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_2
c     b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_1
c     b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨  b^{240, 2}_0
c  in DIMACS:
 22640 -22641  22642  240 -22643 0
 22640 -22641  22642  240 -22644 0
 22640 -22641  22642  240  22645 0

c  1-1 --> 0
c    (-b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧  b^{240, 1}_0 ∧ -p_240) -> (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧ -b^{240, 2}_0)
c  in CNF:
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_2
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_1
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_0
c  in DIMACS:
 22640  22641 -22642  240 -22643 0
 22640  22641 -22642  240 -22644 0
 22640  22641 -22642  240 -22645 0

c  0-1 --> -1
c    (-b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧ -p_240) -> ( b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0)
c  in CNF:
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨  b^{240, 2}_2
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_1
c     b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨  b^{240, 2}_0
c  in DIMACS:
 22640  22641  22642  240  22643 0
 22640  22641  22642  240 -22644 0
 22640  22641  22642  240  22645 0

c  -1-1 --> -2
c    ( b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧  b^{240, 1}_0 ∧ -p_240) -> ( b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0)
c  in CNF:
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨  b^{240, 2}_2
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨  b^{240, 2}_1
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨  p_240 ∨ -b^{240, 2}_0
c  in DIMACS:
-22640  22641 -22642  240  22643 0
-22640  22641 -22642  240  22644 0
-22640  22641 -22642  240 -22645 0

c  -2-1 --> break 
c    ( b^{240, 1}_2 ∧  b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧ -p_240) -> break
c  in CNF:
c    -b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨  b^{240, 1}_0 ∨  p_240 ∨ break
c  in DIMACS:
-22640 -22641  22642  240 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{240, 1}_2 ∧ -b^{240, 1}_1 ∧ -b^{240, 1}_0 ∧ true) 
c  in CNF:
c    -b^{240, 1}_2 ∨  b^{240, 1}_1 ∨  b^{240, 1}_0 ∨ false 
c  in DIMACS:
-22640  22641  22642  0

c  3 does not represent an automaton state.
c    -(-b^{240, 1}_2 ∧  b^{240, 1}_1 ∧  b^{240, 1}_0 ∧ true) 
c  in CNF:
c     b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ false 
c  in DIMACS:
 22640 -22641 -22642  0
c  -3 does not represent an automaton state.
c    -( b^{240, 1}_2 ∧  b^{240, 1}_1 ∧  b^{240, 1}_0 ∧ true) 
c  in CNF:
c    -b^{240, 1}_2 ∨ -b^{240, 1}_1 ∨ -b^{240, 1}_0 ∨ false 
c  in DIMACS:
-22640 -22641 -22642  0

c i = 2
c  -2+1 --> -1
c    ( b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧  p_480) -> ( b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0)
c  in CNF:
c    -b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨  b^{240, 3}_2
c    -b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_1
c    -b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨  b^{240, 3}_0
c  in DIMACS:
-22643 -22644  22645 -480  22646 0
-22643 -22644  22645 -480 -22647 0
-22643 -22644  22645 -480  22648 0

c  -1+1 --> 0
c    ( b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0 ∧  p_480) -> (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧ -b^{240, 3}_0)
c  in CNF:
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_2
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_1
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_0
c  in DIMACS:
-22643  22644 -22645 -480 -22646 0
-22643  22644 -22645 -480 -22647 0
-22643  22644 -22645 -480 -22648 0

c  0+1 --> 1
c    (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧  p_480) -> (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0)
c  in CNF:
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_2
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_1
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨  b^{240, 3}_0
c  in DIMACS:
 22643  22644  22645 -480 -22646 0
 22643  22644  22645 -480 -22647 0
 22643  22644  22645 -480  22648 0

c  1+1 --> 2
c    (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0 ∧  p_480) -> (-b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0)
c  in CNF:
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_2
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨  b^{240, 3}_1
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ -p_480 ∨ -b^{240, 3}_0
c  in DIMACS:
 22643  22644 -22645 -480 -22646 0
 22643  22644 -22645 -480  22647 0
 22643  22644 -22645 -480 -22648 0

c  2+1 --> break 
c    (-b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧  p_480) -> break
c  in CNF:
c     b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ -p_480 ∨ break
c  in DIMACS:
 22643 -22644  22645 -480 1162 0


c  2-1 --> 1
c    (-b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧ -p_480) -> (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0)
c  in CNF:
c     b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_2
c     b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_1
c     b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨  b^{240, 3}_0
c  in DIMACS:
 22643 -22644  22645  480 -22646 0
 22643 -22644  22645  480 -22647 0
 22643 -22644  22645  480  22648 0

c  1-1 --> 0
c    (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0 ∧ -p_480) -> (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧ -b^{240, 3}_0)
c  in CNF:
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_2
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_1
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_0
c  in DIMACS:
 22643  22644 -22645  480 -22646 0
 22643  22644 -22645  480 -22647 0
 22643  22644 -22645  480 -22648 0

c  0-1 --> -1
c    (-b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧ -p_480) -> ( b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0)
c  in CNF:
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨  b^{240, 3}_2
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_1
c     b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨  b^{240, 3}_0
c  in DIMACS:
 22643  22644  22645  480  22646 0
 22643  22644  22645  480 -22647 0
 22643  22644  22645  480  22648 0

c  -1-1 --> -2
c    ( b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧  b^{240, 2}_0 ∧ -p_480) -> ( b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0)
c  in CNF:
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨  b^{240, 3}_2
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨  b^{240, 3}_1
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨  p_480 ∨ -b^{240, 3}_0
c  in DIMACS:
-22643  22644 -22645  480  22646 0
-22643  22644 -22645  480  22647 0
-22643  22644 -22645  480 -22648 0

c  -2-1 --> break 
c    ( b^{240, 2}_2 ∧  b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧ -p_480) -> break
c  in CNF:
c    -b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨  b^{240, 2}_0 ∨  p_480 ∨ break
c  in DIMACS:
-22643 -22644  22645  480 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{240, 2}_2 ∧ -b^{240, 2}_1 ∧ -b^{240, 2}_0 ∧ true) 
c  in CNF:
c    -b^{240, 2}_2 ∨  b^{240, 2}_1 ∨  b^{240, 2}_0 ∨ false 
c  in DIMACS:
-22643  22644  22645  0

c  3 does not represent an automaton state.
c    -(-b^{240, 2}_2 ∧  b^{240, 2}_1 ∧  b^{240, 2}_0 ∧ true) 
c  in CNF:
c     b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ false 
c  in DIMACS:
 22643 -22644 -22645  0
c  -3 does not represent an automaton state.
c    -( b^{240, 2}_2 ∧  b^{240, 2}_1 ∧  b^{240, 2}_0 ∧ true) 
c  in CNF:
c    -b^{240, 2}_2 ∨ -b^{240, 2}_1 ∨ -b^{240, 2}_0 ∨ false 
c  in DIMACS:
-22643 -22644 -22645  0

c i = 3
c  -2+1 --> -1
c    ( b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧  p_720) -> ( b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0)
c  in CNF:
c    -b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨  b^{240, 4}_2
c    -b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_1
c    -b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨  b^{240, 4}_0
c  in DIMACS:
-22646 -22647  22648 -720  22649 0
-22646 -22647  22648 -720 -22650 0
-22646 -22647  22648 -720  22651 0

c  -1+1 --> 0
c    ( b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0 ∧  p_720) -> (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧ -b^{240, 4}_0)
c  in CNF:
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_2
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_1
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_0
c  in DIMACS:
-22646  22647 -22648 -720 -22649 0
-22646  22647 -22648 -720 -22650 0
-22646  22647 -22648 -720 -22651 0

c  0+1 --> 1
c    (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧  p_720) -> (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0)
c  in CNF:
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_2
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_1
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨  b^{240, 4}_0
c  in DIMACS:
 22646  22647  22648 -720 -22649 0
 22646  22647  22648 -720 -22650 0
 22646  22647  22648 -720  22651 0

c  1+1 --> 2
c    (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0 ∧  p_720) -> (-b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0)
c  in CNF:
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_2
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨  b^{240, 4}_1
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ -p_720 ∨ -b^{240, 4}_0
c  in DIMACS:
 22646  22647 -22648 -720 -22649 0
 22646  22647 -22648 -720  22650 0
 22646  22647 -22648 -720 -22651 0

c  2+1 --> break 
c    (-b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧  p_720) -> break
c  in CNF:
c     b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 22646 -22647  22648 -720 1162 0


c  2-1 --> 1
c    (-b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧ -p_720) -> (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0)
c  in CNF:
c     b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_2
c     b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_1
c     b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨  b^{240, 4}_0
c  in DIMACS:
 22646 -22647  22648  720 -22649 0
 22646 -22647  22648  720 -22650 0
 22646 -22647  22648  720  22651 0

c  1-1 --> 0
c    (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0 ∧ -p_720) -> (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧ -b^{240, 4}_0)
c  in CNF:
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_2
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_1
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_0
c  in DIMACS:
 22646  22647 -22648  720 -22649 0
 22646  22647 -22648  720 -22650 0
 22646  22647 -22648  720 -22651 0

c  0-1 --> -1
c    (-b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧ -p_720) -> ( b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0)
c  in CNF:
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨  b^{240, 4}_2
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_1
c     b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨  b^{240, 4}_0
c  in DIMACS:
 22646  22647  22648  720  22649 0
 22646  22647  22648  720 -22650 0
 22646  22647  22648  720  22651 0

c  -1-1 --> -2
c    ( b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧  b^{240, 3}_0 ∧ -p_720) -> ( b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0)
c  in CNF:
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨  b^{240, 4}_2
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨  b^{240, 4}_1
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨  p_720 ∨ -b^{240, 4}_0
c  in DIMACS:
-22646  22647 -22648  720  22649 0
-22646  22647 -22648  720  22650 0
-22646  22647 -22648  720 -22651 0

c  -2-1 --> break 
c    ( b^{240, 3}_2 ∧  b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨  b^{240, 3}_0 ∨  p_720 ∨ break
c  in DIMACS:
-22646 -22647  22648  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{240, 3}_2 ∧ -b^{240, 3}_1 ∧ -b^{240, 3}_0 ∧ true) 
c  in CNF:
c    -b^{240, 3}_2 ∨  b^{240, 3}_1 ∨  b^{240, 3}_0 ∨ false 
c  in DIMACS:
-22646  22647  22648  0

c  3 does not represent an automaton state.
c    -(-b^{240, 3}_2 ∧  b^{240, 3}_1 ∧  b^{240, 3}_0 ∧ true) 
c  in CNF:
c     b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ false 
c  in DIMACS:
 22646 -22647 -22648  0
c  -3 does not represent an automaton state.
c    -( b^{240, 3}_2 ∧  b^{240, 3}_1 ∧  b^{240, 3}_0 ∧ true) 
c  in CNF:
c    -b^{240, 3}_2 ∨ -b^{240, 3}_1 ∨ -b^{240, 3}_0 ∨ false 
c  in DIMACS:
-22646 -22647 -22648  0

c i = 4
c  -2+1 --> -1
c    ( b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧  p_960) -> ( b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧  b^{240, 5}_0)
c  in CNF:
c    -b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨  b^{240, 5}_2
c    -b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_1
c    -b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨  b^{240, 5}_0
c  in DIMACS:
-22649 -22650  22651 -960  22652 0
-22649 -22650  22651 -960 -22653 0
-22649 -22650  22651 -960  22654 0

c  -1+1 --> 0
c    ( b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0 ∧  p_960) -> (-b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧ -b^{240, 5}_0)
c  in CNF:
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_2
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_1
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_0
c  in DIMACS:
-22649  22650 -22651 -960 -22652 0
-22649  22650 -22651 -960 -22653 0
-22649  22650 -22651 -960 -22654 0

c  0+1 --> 1
c    (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧  p_960) -> (-b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧  b^{240, 5}_0)
c  in CNF:
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_2
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_1
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨  b^{240, 5}_0
c  in DIMACS:
 22649  22650  22651 -960 -22652 0
 22649  22650  22651 -960 -22653 0
 22649  22650  22651 -960  22654 0

c  1+1 --> 2
c    (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0 ∧  p_960) -> (-b^{240, 5}_2 ∧  b^{240, 5}_1 ∧ -b^{240, 5}_0)
c  in CNF:
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_2
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨  b^{240, 5}_1
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ -p_960 ∨ -b^{240, 5}_0
c  in DIMACS:
 22649  22650 -22651 -960 -22652 0
 22649  22650 -22651 -960  22653 0
 22649  22650 -22651 -960 -22654 0

c  2+1 --> break 
c    (-b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧  p_960) -> break
c  in CNF:
c     b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 22649 -22650  22651 -960 1162 0


c  2-1 --> 1
c    (-b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧ -p_960) -> (-b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧  b^{240, 5}_0)
c  in CNF:
c     b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_2
c     b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_1
c     b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨  b^{240, 5}_0
c  in DIMACS:
 22649 -22650  22651  960 -22652 0
 22649 -22650  22651  960 -22653 0
 22649 -22650  22651  960  22654 0

c  1-1 --> 0
c    (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0 ∧ -p_960) -> (-b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧ -b^{240, 5}_0)
c  in CNF:
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_2
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_1
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_0
c  in DIMACS:
 22649  22650 -22651  960 -22652 0
 22649  22650 -22651  960 -22653 0
 22649  22650 -22651  960 -22654 0

c  0-1 --> -1
c    (-b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧ -p_960) -> ( b^{240, 5}_2 ∧ -b^{240, 5}_1 ∧  b^{240, 5}_0)
c  in CNF:
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨  b^{240, 5}_2
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_1
c     b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨  b^{240, 5}_0
c  in DIMACS:
 22649  22650  22651  960  22652 0
 22649  22650  22651  960 -22653 0
 22649  22650  22651  960  22654 0

c  -1-1 --> -2
c    ( b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧  b^{240, 4}_0 ∧ -p_960) -> ( b^{240, 5}_2 ∧  b^{240, 5}_1 ∧ -b^{240, 5}_0)
c  in CNF:
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨  b^{240, 5}_2
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨  b^{240, 5}_1
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨  p_960 ∨ -b^{240, 5}_0
c  in DIMACS:
-22649  22650 -22651  960  22652 0
-22649  22650 -22651  960  22653 0
-22649  22650 -22651  960 -22654 0

c  -2-1 --> break 
c    ( b^{240, 4}_2 ∧  b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨  b^{240, 4}_0 ∨  p_960 ∨ break
c  in DIMACS:
-22649 -22650  22651  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{240, 4}_2 ∧ -b^{240, 4}_1 ∧ -b^{240, 4}_0 ∧ true) 
c  in CNF:
c    -b^{240, 4}_2 ∨  b^{240, 4}_1 ∨  b^{240, 4}_0 ∨ false 
c  in DIMACS:
-22649  22650  22651  0

c  3 does not represent an automaton state.
c    -(-b^{240, 4}_2 ∧  b^{240, 4}_1 ∧  b^{240, 4}_0 ∧ true) 
c  in CNF:
c     b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ false 
c  in DIMACS:
 22649 -22650 -22651  0
c  -3 does not represent an automaton state.
c    -( b^{240, 4}_2 ∧  b^{240, 4}_1 ∧  b^{240, 4}_0 ∧ true) 
c  in CNF:
c    -b^{240, 4}_2 ∨ -b^{240, 4}_1 ∨ -b^{240, 4}_0 ∨ false 
c  in DIMACS:
-22649 -22650 -22651  0

c INIT for k = 241
c    -b^{241, 1}_2
c    -b^{241, 1}_1
c    -b^{241, 1}_0
c  in DIMACS:
-22655 0
-22656 0
-22657 0

c Transitions for k = 241
c i = 1
c  -2+1 --> -1
c    ( b^{241, 1}_2 ∧  b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧  p_241) -> ( b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0)
c  in CNF:
c    -b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨  b^{241, 2}_2
c    -b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_1
c    -b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨  b^{241, 2}_0
c  in DIMACS:
-22655 -22656  22657 -241  22658 0
-22655 -22656  22657 -241 -22659 0
-22655 -22656  22657 -241  22660 0

c  -1+1 --> 0
c    ( b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧  b^{241, 1}_0 ∧  p_241) -> (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧ -b^{241, 2}_0)
c  in CNF:
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_2
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_1
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_0
c  in DIMACS:
-22655  22656 -22657 -241 -22658 0
-22655  22656 -22657 -241 -22659 0
-22655  22656 -22657 -241 -22660 0

c  0+1 --> 1
c    (-b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧  p_241) -> (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0)
c  in CNF:
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_2
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_1
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨  b^{241, 2}_0
c  in DIMACS:
 22655  22656  22657 -241 -22658 0
 22655  22656  22657 -241 -22659 0
 22655  22656  22657 -241  22660 0

c  1+1 --> 2
c    (-b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧  b^{241, 1}_0 ∧  p_241) -> (-b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0)
c  in CNF:
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_2
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨  b^{241, 2}_1
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ -p_241 ∨ -b^{241, 2}_0
c  in DIMACS:
 22655  22656 -22657 -241 -22658 0
 22655  22656 -22657 -241  22659 0
 22655  22656 -22657 -241 -22660 0

c  2+1 --> break 
c    (-b^{241, 1}_2 ∧  b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧  p_241) -> break
c  in CNF:
c     b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ -p_241 ∨ break
c  in DIMACS:
 22655 -22656  22657 -241 1162 0


c  2-1 --> 1
c    (-b^{241, 1}_2 ∧  b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧ -p_241) -> (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0)
c  in CNF:
c     b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_2
c     b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_1
c     b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨  b^{241, 2}_0
c  in DIMACS:
 22655 -22656  22657  241 -22658 0
 22655 -22656  22657  241 -22659 0
 22655 -22656  22657  241  22660 0

c  1-1 --> 0
c    (-b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧  b^{241, 1}_0 ∧ -p_241) -> (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧ -b^{241, 2}_0)
c  in CNF:
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_2
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_1
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_0
c  in DIMACS:
 22655  22656 -22657  241 -22658 0
 22655  22656 -22657  241 -22659 0
 22655  22656 -22657  241 -22660 0

c  0-1 --> -1
c    (-b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧ -p_241) -> ( b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0)
c  in CNF:
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨  b^{241, 2}_2
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_1
c     b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨  b^{241, 2}_0
c  in DIMACS:
 22655  22656  22657  241  22658 0
 22655  22656  22657  241 -22659 0
 22655  22656  22657  241  22660 0

c  -1-1 --> -2
c    ( b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧  b^{241, 1}_0 ∧ -p_241) -> ( b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0)
c  in CNF:
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨  b^{241, 2}_2
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨  b^{241, 2}_1
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨  p_241 ∨ -b^{241, 2}_0
c  in DIMACS:
-22655  22656 -22657  241  22658 0
-22655  22656 -22657  241  22659 0
-22655  22656 -22657  241 -22660 0

c  -2-1 --> break 
c    ( b^{241, 1}_2 ∧  b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧ -p_241) -> break
c  in CNF:
c    -b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨  b^{241, 1}_0 ∨  p_241 ∨ break
c  in DIMACS:
-22655 -22656  22657  241 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{241, 1}_2 ∧ -b^{241, 1}_1 ∧ -b^{241, 1}_0 ∧ true) 
c  in CNF:
c    -b^{241, 1}_2 ∨  b^{241, 1}_1 ∨  b^{241, 1}_0 ∨ false 
c  in DIMACS:
-22655  22656  22657  0

c  3 does not represent an automaton state.
c    -(-b^{241, 1}_2 ∧  b^{241, 1}_1 ∧  b^{241, 1}_0 ∧ true) 
c  in CNF:
c     b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ false 
c  in DIMACS:
 22655 -22656 -22657  0
c  -3 does not represent an automaton state.
c    -( b^{241, 1}_2 ∧  b^{241, 1}_1 ∧  b^{241, 1}_0 ∧ true) 
c  in CNF:
c    -b^{241, 1}_2 ∨ -b^{241, 1}_1 ∨ -b^{241, 1}_0 ∨ false 
c  in DIMACS:
-22655 -22656 -22657  0

c i = 2
c  -2+1 --> -1
c    ( b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧  p_482) -> ( b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0)
c  in CNF:
c    -b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨  b^{241, 3}_2
c    -b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_1
c    -b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨  b^{241, 3}_0
c  in DIMACS:
-22658 -22659  22660 -482  22661 0
-22658 -22659  22660 -482 -22662 0
-22658 -22659  22660 -482  22663 0

c  -1+1 --> 0
c    ( b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0 ∧  p_482) -> (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧ -b^{241, 3}_0)
c  in CNF:
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_2
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_1
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_0
c  in DIMACS:
-22658  22659 -22660 -482 -22661 0
-22658  22659 -22660 -482 -22662 0
-22658  22659 -22660 -482 -22663 0

c  0+1 --> 1
c    (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧  p_482) -> (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0)
c  in CNF:
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_2
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_1
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨  b^{241, 3}_0
c  in DIMACS:
 22658  22659  22660 -482 -22661 0
 22658  22659  22660 -482 -22662 0
 22658  22659  22660 -482  22663 0

c  1+1 --> 2
c    (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0 ∧  p_482) -> (-b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0)
c  in CNF:
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_2
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨  b^{241, 3}_1
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ -p_482 ∨ -b^{241, 3}_0
c  in DIMACS:
 22658  22659 -22660 -482 -22661 0
 22658  22659 -22660 -482  22662 0
 22658  22659 -22660 -482 -22663 0

c  2+1 --> break 
c    (-b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧  p_482) -> break
c  in CNF:
c     b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ -p_482 ∨ break
c  in DIMACS:
 22658 -22659  22660 -482 1162 0


c  2-1 --> 1
c    (-b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧ -p_482) -> (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0)
c  in CNF:
c     b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_2
c     b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_1
c     b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨  b^{241, 3}_0
c  in DIMACS:
 22658 -22659  22660  482 -22661 0
 22658 -22659  22660  482 -22662 0
 22658 -22659  22660  482  22663 0

c  1-1 --> 0
c    (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0 ∧ -p_482) -> (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧ -b^{241, 3}_0)
c  in CNF:
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_2
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_1
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_0
c  in DIMACS:
 22658  22659 -22660  482 -22661 0
 22658  22659 -22660  482 -22662 0
 22658  22659 -22660  482 -22663 0

c  0-1 --> -1
c    (-b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧ -p_482) -> ( b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0)
c  in CNF:
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨  b^{241, 3}_2
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_1
c     b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨  b^{241, 3}_0
c  in DIMACS:
 22658  22659  22660  482  22661 0
 22658  22659  22660  482 -22662 0
 22658  22659  22660  482  22663 0

c  -1-1 --> -2
c    ( b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧  b^{241, 2}_0 ∧ -p_482) -> ( b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0)
c  in CNF:
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨  b^{241, 3}_2
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨  b^{241, 3}_1
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨  p_482 ∨ -b^{241, 3}_0
c  in DIMACS:
-22658  22659 -22660  482  22661 0
-22658  22659 -22660  482  22662 0
-22658  22659 -22660  482 -22663 0

c  -2-1 --> break 
c    ( b^{241, 2}_2 ∧  b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧ -p_482) -> break
c  in CNF:
c    -b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨  b^{241, 2}_0 ∨  p_482 ∨ break
c  in DIMACS:
-22658 -22659  22660  482 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{241, 2}_2 ∧ -b^{241, 2}_1 ∧ -b^{241, 2}_0 ∧ true) 
c  in CNF:
c    -b^{241, 2}_2 ∨  b^{241, 2}_1 ∨  b^{241, 2}_0 ∨ false 
c  in DIMACS:
-22658  22659  22660  0

c  3 does not represent an automaton state.
c    -(-b^{241, 2}_2 ∧  b^{241, 2}_1 ∧  b^{241, 2}_0 ∧ true) 
c  in CNF:
c     b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ false 
c  in DIMACS:
 22658 -22659 -22660  0
c  -3 does not represent an automaton state.
c    -( b^{241, 2}_2 ∧  b^{241, 2}_1 ∧  b^{241, 2}_0 ∧ true) 
c  in CNF:
c    -b^{241, 2}_2 ∨ -b^{241, 2}_1 ∨ -b^{241, 2}_0 ∨ false 
c  in DIMACS:
-22658 -22659 -22660  0

c i = 3
c  -2+1 --> -1
c    ( b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧  p_723) -> ( b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0)
c  in CNF:
c    -b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨  b^{241, 4}_2
c    -b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_1
c    -b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨  b^{241, 4}_0
c  in DIMACS:
-22661 -22662  22663 -723  22664 0
-22661 -22662  22663 -723 -22665 0
-22661 -22662  22663 -723  22666 0

c  -1+1 --> 0
c    ( b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0 ∧  p_723) -> (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧ -b^{241, 4}_0)
c  in CNF:
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_2
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_1
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_0
c  in DIMACS:
-22661  22662 -22663 -723 -22664 0
-22661  22662 -22663 -723 -22665 0
-22661  22662 -22663 -723 -22666 0

c  0+1 --> 1
c    (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧  p_723) -> (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0)
c  in CNF:
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_2
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_1
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨  b^{241, 4}_0
c  in DIMACS:
 22661  22662  22663 -723 -22664 0
 22661  22662  22663 -723 -22665 0
 22661  22662  22663 -723  22666 0

c  1+1 --> 2
c    (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0 ∧  p_723) -> (-b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0)
c  in CNF:
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_2
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨  b^{241, 4}_1
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ -p_723 ∨ -b^{241, 4}_0
c  in DIMACS:
 22661  22662 -22663 -723 -22664 0
 22661  22662 -22663 -723  22665 0
 22661  22662 -22663 -723 -22666 0

c  2+1 --> break 
c    (-b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧  p_723) -> break
c  in CNF:
c     b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ -p_723 ∨ break
c  in DIMACS:
 22661 -22662  22663 -723 1162 0


c  2-1 --> 1
c    (-b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧ -p_723) -> (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0)
c  in CNF:
c     b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_2
c     b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_1
c     b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨  b^{241, 4}_0
c  in DIMACS:
 22661 -22662  22663  723 -22664 0
 22661 -22662  22663  723 -22665 0
 22661 -22662  22663  723  22666 0

c  1-1 --> 0
c    (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0 ∧ -p_723) -> (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧ -b^{241, 4}_0)
c  in CNF:
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_2
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_1
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_0
c  in DIMACS:
 22661  22662 -22663  723 -22664 0
 22661  22662 -22663  723 -22665 0
 22661  22662 -22663  723 -22666 0

c  0-1 --> -1
c    (-b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧ -p_723) -> ( b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0)
c  in CNF:
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨  b^{241, 4}_2
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_1
c     b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨  b^{241, 4}_0
c  in DIMACS:
 22661  22662  22663  723  22664 0
 22661  22662  22663  723 -22665 0
 22661  22662  22663  723  22666 0

c  -1-1 --> -2
c    ( b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧  b^{241, 3}_0 ∧ -p_723) -> ( b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0)
c  in CNF:
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨  b^{241, 4}_2
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨  b^{241, 4}_1
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨  p_723 ∨ -b^{241, 4}_0
c  in DIMACS:
-22661  22662 -22663  723  22664 0
-22661  22662 -22663  723  22665 0
-22661  22662 -22663  723 -22666 0

c  -2-1 --> break 
c    ( b^{241, 3}_2 ∧  b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧ -p_723) -> break
c  in CNF:
c    -b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨  b^{241, 3}_0 ∨  p_723 ∨ break
c  in DIMACS:
-22661 -22662  22663  723 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{241, 3}_2 ∧ -b^{241, 3}_1 ∧ -b^{241, 3}_0 ∧ true) 
c  in CNF:
c    -b^{241, 3}_2 ∨  b^{241, 3}_1 ∨  b^{241, 3}_0 ∨ false 
c  in DIMACS:
-22661  22662  22663  0

c  3 does not represent an automaton state.
c    -(-b^{241, 3}_2 ∧  b^{241, 3}_1 ∧  b^{241, 3}_0 ∧ true) 
c  in CNF:
c     b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ false 
c  in DIMACS:
 22661 -22662 -22663  0
c  -3 does not represent an automaton state.
c    -( b^{241, 3}_2 ∧  b^{241, 3}_1 ∧  b^{241, 3}_0 ∧ true) 
c  in CNF:
c    -b^{241, 3}_2 ∨ -b^{241, 3}_1 ∨ -b^{241, 3}_0 ∨ false 
c  in DIMACS:
-22661 -22662 -22663  0

c i = 4
c  -2+1 --> -1
c    ( b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧  p_964) -> ( b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧  b^{241, 5}_0)
c  in CNF:
c    -b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨  b^{241, 5}_2
c    -b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_1
c    -b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨  b^{241, 5}_0
c  in DIMACS:
-22664 -22665  22666 -964  22667 0
-22664 -22665  22666 -964 -22668 0
-22664 -22665  22666 -964  22669 0

c  -1+1 --> 0
c    ( b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0 ∧  p_964) -> (-b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧ -b^{241, 5}_0)
c  in CNF:
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_2
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_1
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_0
c  in DIMACS:
-22664  22665 -22666 -964 -22667 0
-22664  22665 -22666 -964 -22668 0
-22664  22665 -22666 -964 -22669 0

c  0+1 --> 1
c    (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧  p_964) -> (-b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧  b^{241, 5}_0)
c  in CNF:
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_2
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_1
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨  b^{241, 5}_0
c  in DIMACS:
 22664  22665  22666 -964 -22667 0
 22664  22665  22666 -964 -22668 0
 22664  22665  22666 -964  22669 0

c  1+1 --> 2
c    (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0 ∧  p_964) -> (-b^{241, 5}_2 ∧  b^{241, 5}_1 ∧ -b^{241, 5}_0)
c  in CNF:
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_2
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨  b^{241, 5}_1
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ -p_964 ∨ -b^{241, 5}_0
c  in DIMACS:
 22664  22665 -22666 -964 -22667 0
 22664  22665 -22666 -964  22668 0
 22664  22665 -22666 -964 -22669 0

c  2+1 --> break 
c    (-b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧  p_964) -> break
c  in CNF:
c     b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ -p_964 ∨ break
c  in DIMACS:
 22664 -22665  22666 -964 1162 0


c  2-1 --> 1
c    (-b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧ -p_964) -> (-b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧  b^{241, 5}_0)
c  in CNF:
c     b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_2
c     b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_1
c     b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨  b^{241, 5}_0
c  in DIMACS:
 22664 -22665  22666  964 -22667 0
 22664 -22665  22666  964 -22668 0
 22664 -22665  22666  964  22669 0

c  1-1 --> 0
c    (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0 ∧ -p_964) -> (-b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧ -b^{241, 5}_0)
c  in CNF:
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_2
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_1
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_0
c  in DIMACS:
 22664  22665 -22666  964 -22667 0
 22664  22665 -22666  964 -22668 0
 22664  22665 -22666  964 -22669 0

c  0-1 --> -1
c    (-b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧ -p_964) -> ( b^{241, 5}_2 ∧ -b^{241, 5}_1 ∧  b^{241, 5}_0)
c  in CNF:
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨  b^{241, 5}_2
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_1
c     b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨  b^{241, 5}_0
c  in DIMACS:
 22664  22665  22666  964  22667 0
 22664  22665  22666  964 -22668 0
 22664  22665  22666  964  22669 0

c  -1-1 --> -2
c    ( b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧  b^{241, 4}_0 ∧ -p_964) -> ( b^{241, 5}_2 ∧  b^{241, 5}_1 ∧ -b^{241, 5}_0)
c  in CNF:
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨  b^{241, 5}_2
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨  b^{241, 5}_1
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨  p_964 ∨ -b^{241, 5}_0
c  in DIMACS:
-22664  22665 -22666  964  22667 0
-22664  22665 -22666  964  22668 0
-22664  22665 -22666  964 -22669 0

c  -2-1 --> break 
c    ( b^{241, 4}_2 ∧  b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧ -p_964) -> break
c  in CNF:
c    -b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨  b^{241, 4}_0 ∨  p_964 ∨ break
c  in DIMACS:
-22664 -22665  22666  964 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{241, 4}_2 ∧ -b^{241, 4}_1 ∧ -b^{241, 4}_0 ∧ true) 
c  in CNF:
c    -b^{241, 4}_2 ∨  b^{241, 4}_1 ∨  b^{241, 4}_0 ∨ false 
c  in DIMACS:
-22664  22665  22666  0

c  3 does not represent an automaton state.
c    -(-b^{241, 4}_2 ∧  b^{241, 4}_1 ∧  b^{241, 4}_0 ∧ true) 
c  in CNF:
c     b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ false 
c  in DIMACS:
 22664 -22665 -22666  0
c  -3 does not represent an automaton state.
c    -( b^{241, 4}_2 ∧  b^{241, 4}_1 ∧  b^{241, 4}_0 ∧ true) 
c  in CNF:
c    -b^{241, 4}_2 ∨ -b^{241, 4}_1 ∨ -b^{241, 4}_0 ∨ false 
c  in DIMACS:
-22664 -22665 -22666  0

c INIT for k = 242
c    -b^{242, 1}_2
c    -b^{242, 1}_1
c    -b^{242, 1}_0
c  in DIMACS:
-22670 0
-22671 0
-22672 0

c Transitions for k = 242
c i = 1
c  -2+1 --> -1
c    ( b^{242, 1}_2 ∧  b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧  p_242) -> ( b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0)
c  in CNF:
c    -b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨  b^{242, 2}_2
c    -b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_1
c    -b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨  b^{242, 2}_0
c  in DIMACS:
-22670 -22671  22672 -242  22673 0
-22670 -22671  22672 -242 -22674 0
-22670 -22671  22672 -242  22675 0

c  -1+1 --> 0
c    ( b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧  b^{242, 1}_0 ∧  p_242) -> (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧ -b^{242, 2}_0)
c  in CNF:
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_2
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_1
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_0
c  in DIMACS:
-22670  22671 -22672 -242 -22673 0
-22670  22671 -22672 -242 -22674 0
-22670  22671 -22672 -242 -22675 0

c  0+1 --> 1
c    (-b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧  p_242) -> (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0)
c  in CNF:
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_2
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_1
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨  b^{242, 2}_0
c  in DIMACS:
 22670  22671  22672 -242 -22673 0
 22670  22671  22672 -242 -22674 0
 22670  22671  22672 -242  22675 0

c  1+1 --> 2
c    (-b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧  b^{242, 1}_0 ∧  p_242) -> (-b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0)
c  in CNF:
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_2
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨  b^{242, 2}_1
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ -p_242 ∨ -b^{242, 2}_0
c  in DIMACS:
 22670  22671 -22672 -242 -22673 0
 22670  22671 -22672 -242  22674 0
 22670  22671 -22672 -242 -22675 0

c  2+1 --> break 
c    (-b^{242, 1}_2 ∧  b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧  p_242) -> break
c  in CNF:
c     b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ -p_242 ∨ break
c  in DIMACS:
 22670 -22671  22672 -242 1162 0


c  2-1 --> 1
c    (-b^{242, 1}_2 ∧  b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧ -p_242) -> (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0)
c  in CNF:
c     b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_2
c     b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_1
c     b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨  b^{242, 2}_0
c  in DIMACS:
 22670 -22671  22672  242 -22673 0
 22670 -22671  22672  242 -22674 0
 22670 -22671  22672  242  22675 0

c  1-1 --> 0
c    (-b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧  b^{242, 1}_0 ∧ -p_242) -> (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧ -b^{242, 2}_0)
c  in CNF:
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_2
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_1
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_0
c  in DIMACS:
 22670  22671 -22672  242 -22673 0
 22670  22671 -22672  242 -22674 0
 22670  22671 -22672  242 -22675 0

c  0-1 --> -1
c    (-b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧ -p_242) -> ( b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0)
c  in CNF:
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨  b^{242, 2}_2
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_1
c     b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨  b^{242, 2}_0
c  in DIMACS:
 22670  22671  22672  242  22673 0
 22670  22671  22672  242 -22674 0
 22670  22671  22672  242  22675 0

c  -1-1 --> -2
c    ( b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧  b^{242, 1}_0 ∧ -p_242) -> ( b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0)
c  in CNF:
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨  b^{242, 2}_2
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨  b^{242, 2}_1
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨  p_242 ∨ -b^{242, 2}_0
c  in DIMACS:
-22670  22671 -22672  242  22673 0
-22670  22671 -22672  242  22674 0
-22670  22671 -22672  242 -22675 0

c  -2-1 --> break 
c    ( b^{242, 1}_2 ∧  b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧ -p_242) -> break
c  in CNF:
c    -b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨  b^{242, 1}_0 ∨  p_242 ∨ break
c  in DIMACS:
-22670 -22671  22672  242 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{242, 1}_2 ∧ -b^{242, 1}_1 ∧ -b^{242, 1}_0 ∧ true) 
c  in CNF:
c    -b^{242, 1}_2 ∨  b^{242, 1}_1 ∨  b^{242, 1}_0 ∨ false 
c  in DIMACS:
-22670  22671  22672  0

c  3 does not represent an automaton state.
c    -(-b^{242, 1}_2 ∧  b^{242, 1}_1 ∧  b^{242, 1}_0 ∧ true) 
c  in CNF:
c     b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ false 
c  in DIMACS:
 22670 -22671 -22672  0
c  -3 does not represent an automaton state.
c    -( b^{242, 1}_2 ∧  b^{242, 1}_1 ∧  b^{242, 1}_0 ∧ true) 
c  in CNF:
c    -b^{242, 1}_2 ∨ -b^{242, 1}_1 ∨ -b^{242, 1}_0 ∨ false 
c  in DIMACS:
-22670 -22671 -22672  0

c i = 2
c  -2+1 --> -1
c    ( b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧  p_484) -> ( b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0)
c  in CNF:
c    -b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨  b^{242, 3}_2
c    -b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_1
c    -b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨  b^{242, 3}_0
c  in DIMACS:
-22673 -22674  22675 -484  22676 0
-22673 -22674  22675 -484 -22677 0
-22673 -22674  22675 -484  22678 0

c  -1+1 --> 0
c    ( b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0 ∧  p_484) -> (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧ -b^{242, 3}_0)
c  in CNF:
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_2
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_1
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_0
c  in DIMACS:
-22673  22674 -22675 -484 -22676 0
-22673  22674 -22675 -484 -22677 0
-22673  22674 -22675 -484 -22678 0

c  0+1 --> 1
c    (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧  p_484) -> (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0)
c  in CNF:
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_2
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_1
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨  b^{242, 3}_0
c  in DIMACS:
 22673  22674  22675 -484 -22676 0
 22673  22674  22675 -484 -22677 0
 22673  22674  22675 -484  22678 0

c  1+1 --> 2
c    (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0 ∧  p_484) -> (-b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0)
c  in CNF:
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_2
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨  b^{242, 3}_1
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ -p_484 ∨ -b^{242, 3}_0
c  in DIMACS:
 22673  22674 -22675 -484 -22676 0
 22673  22674 -22675 -484  22677 0
 22673  22674 -22675 -484 -22678 0

c  2+1 --> break 
c    (-b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧  p_484) -> break
c  in CNF:
c     b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ -p_484 ∨ break
c  in DIMACS:
 22673 -22674  22675 -484 1162 0


c  2-1 --> 1
c    (-b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧ -p_484) -> (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0)
c  in CNF:
c     b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_2
c     b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_1
c     b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨  b^{242, 3}_0
c  in DIMACS:
 22673 -22674  22675  484 -22676 0
 22673 -22674  22675  484 -22677 0
 22673 -22674  22675  484  22678 0

c  1-1 --> 0
c    (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0 ∧ -p_484) -> (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧ -b^{242, 3}_0)
c  in CNF:
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_2
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_1
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_0
c  in DIMACS:
 22673  22674 -22675  484 -22676 0
 22673  22674 -22675  484 -22677 0
 22673  22674 -22675  484 -22678 0

c  0-1 --> -1
c    (-b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧ -p_484) -> ( b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0)
c  in CNF:
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨  b^{242, 3}_2
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_1
c     b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨  b^{242, 3}_0
c  in DIMACS:
 22673  22674  22675  484  22676 0
 22673  22674  22675  484 -22677 0
 22673  22674  22675  484  22678 0

c  -1-1 --> -2
c    ( b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧  b^{242, 2}_0 ∧ -p_484) -> ( b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0)
c  in CNF:
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨  b^{242, 3}_2
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨  b^{242, 3}_1
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨  p_484 ∨ -b^{242, 3}_0
c  in DIMACS:
-22673  22674 -22675  484  22676 0
-22673  22674 -22675  484  22677 0
-22673  22674 -22675  484 -22678 0

c  -2-1 --> break 
c    ( b^{242, 2}_2 ∧  b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧ -p_484) -> break
c  in CNF:
c    -b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨  b^{242, 2}_0 ∨  p_484 ∨ break
c  in DIMACS:
-22673 -22674  22675  484 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{242, 2}_2 ∧ -b^{242, 2}_1 ∧ -b^{242, 2}_0 ∧ true) 
c  in CNF:
c    -b^{242, 2}_2 ∨  b^{242, 2}_1 ∨  b^{242, 2}_0 ∨ false 
c  in DIMACS:
-22673  22674  22675  0

c  3 does not represent an automaton state.
c    -(-b^{242, 2}_2 ∧  b^{242, 2}_1 ∧  b^{242, 2}_0 ∧ true) 
c  in CNF:
c     b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ false 
c  in DIMACS:
 22673 -22674 -22675  0
c  -3 does not represent an automaton state.
c    -( b^{242, 2}_2 ∧  b^{242, 2}_1 ∧  b^{242, 2}_0 ∧ true) 
c  in CNF:
c    -b^{242, 2}_2 ∨ -b^{242, 2}_1 ∨ -b^{242, 2}_0 ∨ false 
c  in DIMACS:
-22673 -22674 -22675  0

c i = 3
c  -2+1 --> -1
c    ( b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧  p_726) -> ( b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0)
c  in CNF:
c    -b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨  b^{242, 4}_2
c    -b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_1
c    -b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨  b^{242, 4}_0
c  in DIMACS:
-22676 -22677  22678 -726  22679 0
-22676 -22677  22678 -726 -22680 0
-22676 -22677  22678 -726  22681 0

c  -1+1 --> 0
c    ( b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0 ∧  p_726) -> (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧ -b^{242, 4}_0)
c  in CNF:
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_2
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_1
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_0
c  in DIMACS:
-22676  22677 -22678 -726 -22679 0
-22676  22677 -22678 -726 -22680 0
-22676  22677 -22678 -726 -22681 0

c  0+1 --> 1
c    (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧  p_726) -> (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0)
c  in CNF:
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_2
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_1
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨  b^{242, 4}_0
c  in DIMACS:
 22676  22677  22678 -726 -22679 0
 22676  22677  22678 -726 -22680 0
 22676  22677  22678 -726  22681 0

c  1+1 --> 2
c    (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0 ∧  p_726) -> (-b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0)
c  in CNF:
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_2
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨  b^{242, 4}_1
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ -p_726 ∨ -b^{242, 4}_0
c  in DIMACS:
 22676  22677 -22678 -726 -22679 0
 22676  22677 -22678 -726  22680 0
 22676  22677 -22678 -726 -22681 0

c  2+1 --> break 
c    (-b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧  p_726) -> break
c  in CNF:
c     b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 22676 -22677  22678 -726 1162 0


c  2-1 --> 1
c    (-b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧ -p_726) -> (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0)
c  in CNF:
c     b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_2
c     b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_1
c     b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨  b^{242, 4}_0
c  in DIMACS:
 22676 -22677  22678  726 -22679 0
 22676 -22677  22678  726 -22680 0
 22676 -22677  22678  726  22681 0

c  1-1 --> 0
c    (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0 ∧ -p_726) -> (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧ -b^{242, 4}_0)
c  in CNF:
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_2
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_1
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_0
c  in DIMACS:
 22676  22677 -22678  726 -22679 0
 22676  22677 -22678  726 -22680 0
 22676  22677 -22678  726 -22681 0

c  0-1 --> -1
c    (-b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧ -p_726) -> ( b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0)
c  in CNF:
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨  b^{242, 4}_2
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_1
c     b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨  b^{242, 4}_0
c  in DIMACS:
 22676  22677  22678  726  22679 0
 22676  22677  22678  726 -22680 0
 22676  22677  22678  726  22681 0

c  -1-1 --> -2
c    ( b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧  b^{242, 3}_0 ∧ -p_726) -> ( b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0)
c  in CNF:
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨  b^{242, 4}_2
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨  b^{242, 4}_1
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨  p_726 ∨ -b^{242, 4}_0
c  in DIMACS:
-22676  22677 -22678  726  22679 0
-22676  22677 -22678  726  22680 0
-22676  22677 -22678  726 -22681 0

c  -2-1 --> break 
c    ( b^{242, 3}_2 ∧  b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨  b^{242, 3}_0 ∨  p_726 ∨ break
c  in DIMACS:
-22676 -22677  22678  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{242, 3}_2 ∧ -b^{242, 3}_1 ∧ -b^{242, 3}_0 ∧ true) 
c  in CNF:
c    -b^{242, 3}_2 ∨  b^{242, 3}_1 ∨  b^{242, 3}_0 ∨ false 
c  in DIMACS:
-22676  22677  22678  0

c  3 does not represent an automaton state.
c    -(-b^{242, 3}_2 ∧  b^{242, 3}_1 ∧  b^{242, 3}_0 ∧ true) 
c  in CNF:
c     b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ false 
c  in DIMACS:
 22676 -22677 -22678  0
c  -3 does not represent an automaton state.
c    -( b^{242, 3}_2 ∧  b^{242, 3}_1 ∧  b^{242, 3}_0 ∧ true) 
c  in CNF:
c    -b^{242, 3}_2 ∨ -b^{242, 3}_1 ∨ -b^{242, 3}_0 ∨ false 
c  in DIMACS:
-22676 -22677 -22678  0

c i = 4
c  -2+1 --> -1
c    ( b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧  p_968) -> ( b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧  b^{242, 5}_0)
c  in CNF:
c    -b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨  b^{242, 5}_2
c    -b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_1
c    -b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨  b^{242, 5}_0
c  in DIMACS:
-22679 -22680  22681 -968  22682 0
-22679 -22680  22681 -968 -22683 0
-22679 -22680  22681 -968  22684 0

c  -1+1 --> 0
c    ( b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0 ∧  p_968) -> (-b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧ -b^{242, 5}_0)
c  in CNF:
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_2
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_1
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_0
c  in DIMACS:
-22679  22680 -22681 -968 -22682 0
-22679  22680 -22681 -968 -22683 0
-22679  22680 -22681 -968 -22684 0

c  0+1 --> 1
c    (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧  p_968) -> (-b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧  b^{242, 5}_0)
c  in CNF:
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_2
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_1
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨  b^{242, 5}_0
c  in DIMACS:
 22679  22680  22681 -968 -22682 0
 22679  22680  22681 -968 -22683 0
 22679  22680  22681 -968  22684 0

c  1+1 --> 2
c    (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0 ∧  p_968) -> (-b^{242, 5}_2 ∧  b^{242, 5}_1 ∧ -b^{242, 5}_0)
c  in CNF:
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_2
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨  b^{242, 5}_1
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ -p_968 ∨ -b^{242, 5}_0
c  in DIMACS:
 22679  22680 -22681 -968 -22682 0
 22679  22680 -22681 -968  22683 0
 22679  22680 -22681 -968 -22684 0

c  2+1 --> break 
c    (-b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧  p_968) -> break
c  in CNF:
c     b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ -p_968 ∨ break
c  in DIMACS:
 22679 -22680  22681 -968 1162 0


c  2-1 --> 1
c    (-b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧ -p_968) -> (-b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧  b^{242, 5}_0)
c  in CNF:
c     b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_2
c     b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_1
c     b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨  b^{242, 5}_0
c  in DIMACS:
 22679 -22680  22681  968 -22682 0
 22679 -22680  22681  968 -22683 0
 22679 -22680  22681  968  22684 0

c  1-1 --> 0
c    (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0 ∧ -p_968) -> (-b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧ -b^{242, 5}_0)
c  in CNF:
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_2
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_1
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_0
c  in DIMACS:
 22679  22680 -22681  968 -22682 0
 22679  22680 -22681  968 -22683 0
 22679  22680 -22681  968 -22684 0

c  0-1 --> -1
c    (-b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧ -p_968) -> ( b^{242, 5}_2 ∧ -b^{242, 5}_1 ∧  b^{242, 5}_0)
c  in CNF:
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨  b^{242, 5}_2
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_1
c     b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨  b^{242, 5}_0
c  in DIMACS:
 22679  22680  22681  968  22682 0
 22679  22680  22681  968 -22683 0
 22679  22680  22681  968  22684 0

c  -1-1 --> -2
c    ( b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧  b^{242, 4}_0 ∧ -p_968) -> ( b^{242, 5}_2 ∧  b^{242, 5}_1 ∧ -b^{242, 5}_0)
c  in CNF:
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨  b^{242, 5}_2
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨  b^{242, 5}_1
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨  p_968 ∨ -b^{242, 5}_0
c  in DIMACS:
-22679  22680 -22681  968  22682 0
-22679  22680 -22681  968  22683 0
-22679  22680 -22681  968 -22684 0

c  -2-1 --> break 
c    ( b^{242, 4}_2 ∧  b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧ -p_968) -> break
c  in CNF:
c    -b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨  b^{242, 4}_0 ∨  p_968 ∨ break
c  in DIMACS:
-22679 -22680  22681  968 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{242, 4}_2 ∧ -b^{242, 4}_1 ∧ -b^{242, 4}_0 ∧ true) 
c  in CNF:
c    -b^{242, 4}_2 ∨  b^{242, 4}_1 ∨  b^{242, 4}_0 ∨ false 
c  in DIMACS:
-22679  22680  22681  0

c  3 does not represent an automaton state.
c    -(-b^{242, 4}_2 ∧  b^{242, 4}_1 ∧  b^{242, 4}_0 ∧ true) 
c  in CNF:
c     b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ false 
c  in DIMACS:
 22679 -22680 -22681  0
c  -3 does not represent an automaton state.
c    -( b^{242, 4}_2 ∧  b^{242, 4}_1 ∧  b^{242, 4}_0 ∧ true) 
c  in CNF:
c    -b^{242, 4}_2 ∨ -b^{242, 4}_1 ∨ -b^{242, 4}_0 ∨ false 
c  in DIMACS:
-22679 -22680 -22681  0

c INIT for k = 243
c    -b^{243, 1}_2
c    -b^{243, 1}_1
c    -b^{243, 1}_0
c  in DIMACS:
-22685 0
-22686 0
-22687 0

c Transitions for k = 243
c i = 1
c  -2+1 --> -1
c    ( b^{243, 1}_2 ∧  b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧  p_243) -> ( b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0)
c  in CNF:
c    -b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨  b^{243, 2}_2
c    -b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_1
c    -b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨  b^{243, 2}_0
c  in DIMACS:
-22685 -22686  22687 -243  22688 0
-22685 -22686  22687 -243 -22689 0
-22685 -22686  22687 -243  22690 0

c  -1+1 --> 0
c    ( b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧  b^{243, 1}_0 ∧  p_243) -> (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧ -b^{243, 2}_0)
c  in CNF:
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_2
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_1
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_0
c  in DIMACS:
-22685  22686 -22687 -243 -22688 0
-22685  22686 -22687 -243 -22689 0
-22685  22686 -22687 -243 -22690 0

c  0+1 --> 1
c    (-b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧  p_243) -> (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0)
c  in CNF:
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_2
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_1
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨  b^{243, 2}_0
c  in DIMACS:
 22685  22686  22687 -243 -22688 0
 22685  22686  22687 -243 -22689 0
 22685  22686  22687 -243  22690 0

c  1+1 --> 2
c    (-b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧  b^{243, 1}_0 ∧  p_243) -> (-b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0)
c  in CNF:
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_2
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨  b^{243, 2}_1
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ -p_243 ∨ -b^{243, 2}_0
c  in DIMACS:
 22685  22686 -22687 -243 -22688 0
 22685  22686 -22687 -243  22689 0
 22685  22686 -22687 -243 -22690 0

c  2+1 --> break 
c    (-b^{243, 1}_2 ∧  b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧  p_243) -> break
c  in CNF:
c     b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ -p_243 ∨ break
c  in DIMACS:
 22685 -22686  22687 -243 1162 0


c  2-1 --> 1
c    (-b^{243, 1}_2 ∧  b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧ -p_243) -> (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0)
c  in CNF:
c     b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_2
c     b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_1
c     b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨  b^{243, 2}_0
c  in DIMACS:
 22685 -22686  22687  243 -22688 0
 22685 -22686  22687  243 -22689 0
 22685 -22686  22687  243  22690 0

c  1-1 --> 0
c    (-b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧  b^{243, 1}_0 ∧ -p_243) -> (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧ -b^{243, 2}_0)
c  in CNF:
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_2
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_1
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_0
c  in DIMACS:
 22685  22686 -22687  243 -22688 0
 22685  22686 -22687  243 -22689 0
 22685  22686 -22687  243 -22690 0

c  0-1 --> -1
c    (-b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧ -p_243) -> ( b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0)
c  in CNF:
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨  b^{243, 2}_2
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_1
c     b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨  b^{243, 2}_0
c  in DIMACS:
 22685  22686  22687  243  22688 0
 22685  22686  22687  243 -22689 0
 22685  22686  22687  243  22690 0

c  -1-1 --> -2
c    ( b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧  b^{243, 1}_0 ∧ -p_243) -> ( b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0)
c  in CNF:
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨  b^{243, 2}_2
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨  b^{243, 2}_1
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨  p_243 ∨ -b^{243, 2}_0
c  in DIMACS:
-22685  22686 -22687  243  22688 0
-22685  22686 -22687  243  22689 0
-22685  22686 -22687  243 -22690 0

c  -2-1 --> break 
c    ( b^{243, 1}_2 ∧  b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧ -p_243) -> break
c  in CNF:
c    -b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨  b^{243, 1}_0 ∨  p_243 ∨ break
c  in DIMACS:
-22685 -22686  22687  243 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{243, 1}_2 ∧ -b^{243, 1}_1 ∧ -b^{243, 1}_0 ∧ true) 
c  in CNF:
c    -b^{243, 1}_2 ∨  b^{243, 1}_1 ∨  b^{243, 1}_0 ∨ false 
c  in DIMACS:
-22685  22686  22687  0

c  3 does not represent an automaton state.
c    -(-b^{243, 1}_2 ∧  b^{243, 1}_1 ∧  b^{243, 1}_0 ∧ true) 
c  in CNF:
c     b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ false 
c  in DIMACS:
 22685 -22686 -22687  0
c  -3 does not represent an automaton state.
c    -( b^{243, 1}_2 ∧  b^{243, 1}_1 ∧  b^{243, 1}_0 ∧ true) 
c  in CNF:
c    -b^{243, 1}_2 ∨ -b^{243, 1}_1 ∨ -b^{243, 1}_0 ∨ false 
c  in DIMACS:
-22685 -22686 -22687  0

c i = 2
c  -2+1 --> -1
c    ( b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧  p_486) -> ( b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0)
c  in CNF:
c    -b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨  b^{243, 3}_2
c    -b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_1
c    -b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨  b^{243, 3}_0
c  in DIMACS:
-22688 -22689  22690 -486  22691 0
-22688 -22689  22690 -486 -22692 0
-22688 -22689  22690 -486  22693 0

c  -1+1 --> 0
c    ( b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0 ∧  p_486) -> (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧ -b^{243, 3}_0)
c  in CNF:
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_2
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_1
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_0
c  in DIMACS:
-22688  22689 -22690 -486 -22691 0
-22688  22689 -22690 -486 -22692 0
-22688  22689 -22690 -486 -22693 0

c  0+1 --> 1
c    (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧  p_486) -> (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0)
c  in CNF:
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_2
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_1
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨  b^{243, 3}_0
c  in DIMACS:
 22688  22689  22690 -486 -22691 0
 22688  22689  22690 -486 -22692 0
 22688  22689  22690 -486  22693 0

c  1+1 --> 2
c    (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0 ∧  p_486) -> (-b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0)
c  in CNF:
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_2
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨  b^{243, 3}_1
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ -p_486 ∨ -b^{243, 3}_0
c  in DIMACS:
 22688  22689 -22690 -486 -22691 0
 22688  22689 -22690 -486  22692 0
 22688  22689 -22690 -486 -22693 0

c  2+1 --> break 
c    (-b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧  p_486) -> break
c  in CNF:
c     b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ -p_486 ∨ break
c  in DIMACS:
 22688 -22689  22690 -486 1162 0


c  2-1 --> 1
c    (-b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧ -p_486) -> (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0)
c  in CNF:
c     b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_2
c     b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_1
c     b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨  b^{243, 3}_0
c  in DIMACS:
 22688 -22689  22690  486 -22691 0
 22688 -22689  22690  486 -22692 0
 22688 -22689  22690  486  22693 0

c  1-1 --> 0
c    (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0 ∧ -p_486) -> (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧ -b^{243, 3}_0)
c  in CNF:
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_2
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_1
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_0
c  in DIMACS:
 22688  22689 -22690  486 -22691 0
 22688  22689 -22690  486 -22692 0
 22688  22689 -22690  486 -22693 0

c  0-1 --> -1
c    (-b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧ -p_486) -> ( b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0)
c  in CNF:
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨  b^{243, 3}_2
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_1
c     b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨  b^{243, 3}_0
c  in DIMACS:
 22688  22689  22690  486  22691 0
 22688  22689  22690  486 -22692 0
 22688  22689  22690  486  22693 0

c  -1-1 --> -2
c    ( b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧  b^{243, 2}_0 ∧ -p_486) -> ( b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0)
c  in CNF:
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨  b^{243, 3}_2
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨  b^{243, 3}_1
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨  p_486 ∨ -b^{243, 3}_0
c  in DIMACS:
-22688  22689 -22690  486  22691 0
-22688  22689 -22690  486  22692 0
-22688  22689 -22690  486 -22693 0

c  -2-1 --> break 
c    ( b^{243, 2}_2 ∧  b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧ -p_486) -> break
c  in CNF:
c    -b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨  b^{243, 2}_0 ∨  p_486 ∨ break
c  in DIMACS:
-22688 -22689  22690  486 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{243, 2}_2 ∧ -b^{243, 2}_1 ∧ -b^{243, 2}_0 ∧ true) 
c  in CNF:
c    -b^{243, 2}_2 ∨  b^{243, 2}_1 ∨  b^{243, 2}_0 ∨ false 
c  in DIMACS:
-22688  22689  22690  0

c  3 does not represent an automaton state.
c    -(-b^{243, 2}_2 ∧  b^{243, 2}_1 ∧  b^{243, 2}_0 ∧ true) 
c  in CNF:
c     b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ false 
c  in DIMACS:
 22688 -22689 -22690  0
c  -3 does not represent an automaton state.
c    -( b^{243, 2}_2 ∧  b^{243, 2}_1 ∧  b^{243, 2}_0 ∧ true) 
c  in CNF:
c    -b^{243, 2}_2 ∨ -b^{243, 2}_1 ∨ -b^{243, 2}_0 ∨ false 
c  in DIMACS:
-22688 -22689 -22690  0

c i = 3
c  -2+1 --> -1
c    ( b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧  p_729) -> ( b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0)
c  in CNF:
c    -b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨  b^{243, 4}_2
c    -b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_1
c    -b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨  b^{243, 4}_0
c  in DIMACS:
-22691 -22692  22693 -729  22694 0
-22691 -22692  22693 -729 -22695 0
-22691 -22692  22693 -729  22696 0

c  -1+1 --> 0
c    ( b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0 ∧  p_729) -> (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧ -b^{243, 4}_0)
c  in CNF:
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_2
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_1
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_0
c  in DIMACS:
-22691  22692 -22693 -729 -22694 0
-22691  22692 -22693 -729 -22695 0
-22691  22692 -22693 -729 -22696 0

c  0+1 --> 1
c    (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧  p_729) -> (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0)
c  in CNF:
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_2
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_1
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨  b^{243, 4}_0
c  in DIMACS:
 22691  22692  22693 -729 -22694 0
 22691  22692  22693 -729 -22695 0
 22691  22692  22693 -729  22696 0

c  1+1 --> 2
c    (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0 ∧  p_729) -> (-b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0)
c  in CNF:
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_2
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨  b^{243, 4}_1
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ -p_729 ∨ -b^{243, 4}_0
c  in DIMACS:
 22691  22692 -22693 -729 -22694 0
 22691  22692 -22693 -729  22695 0
 22691  22692 -22693 -729 -22696 0

c  2+1 --> break 
c    (-b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧  p_729) -> break
c  in CNF:
c     b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ -p_729 ∨ break
c  in DIMACS:
 22691 -22692  22693 -729 1162 0


c  2-1 --> 1
c    (-b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧ -p_729) -> (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0)
c  in CNF:
c     b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_2
c     b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_1
c     b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨  b^{243, 4}_0
c  in DIMACS:
 22691 -22692  22693  729 -22694 0
 22691 -22692  22693  729 -22695 0
 22691 -22692  22693  729  22696 0

c  1-1 --> 0
c    (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0 ∧ -p_729) -> (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧ -b^{243, 4}_0)
c  in CNF:
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_2
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_1
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_0
c  in DIMACS:
 22691  22692 -22693  729 -22694 0
 22691  22692 -22693  729 -22695 0
 22691  22692 -22693  729 -22696 0

c  0-1 --> -1
c    (-b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧ -p_729) -> ( b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0)
c  in CNF:
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨  b^{243, 4}_2
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_1
c     b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨  b^{243, 4}_0
c  in DIMACS:
 22691  22692  22693  729  22694 0
 22691  22692  22693  729 -22695 0
 22691  22692  22693  729  22696 0

c  -1-1 --> -2
c    ( b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧  b^{243, 3}_0 ∧ -p_729) -> ( b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0)
c  in CNF:
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨  b^{243, 4}_2
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨  b^{243, 4}_1
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨  p_729 ∨ -b^{243, 4}_0
c  in DIMACS:
-22691  22692 -22693  729  22694 0
-22691  22692 -22693  729  22695 0
-22691  22692 -22693  729 -22696 0

c  -2-1 --> break 
c    ( b^{243, 3}_2 ∧  b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧ -p_729) -> break
c  in CNF:
c    -b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨  b^{243, 3}_0 ∨  p_729 ∨ break
c  in DIMACS:
-22691 -22692  22693  729 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{243, 3}_2 ∧ -b^{243, 3}_1 ∧ -b^{243, 3}_0 ∧ true) 
c  in CNF:
c    -b^{243, 3}_2 ∨  b^{243, 3}_1 ∨  b^{243, 3}_0 ∨ false 
c  in DIMACS:
-22691  22692  22693  0

c  3 does not represent an automaton state.
c    -(-b^{243, 3}_2 ∧  b^{243, 3}_1 ∧  b^{243, 3}_0 ∧ true) 
c  in CNF:
c     b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ false 
c  in DIMACS:
 22691 -22692 -22693  0
c  -3 does not represent an automaton state.
c    -( b^{243, 3}_2 ∧  b^{243, 3}_1 ∧  b^{243, 3}_0 ∧ true) 
c  in CNF:
c    -b^{243, 3}_2 ∨ -b^{243, 3}_1 ∨ -b^{243, 3}_0 ∨ false 
c  in DIMACS:
-22691 -22692 -22693  0

c i = 4
c  -2+1 --> -1
c    ( b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧  p_972) -> ( b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧  b^{243, 5}_0)
c  in CNF:
c    -b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨  b^{243, 5}_2
c    -b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_1
c    -b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨  b^{243, 5}_0
c  in DIMACS:
-22694 -22695  22696 -972  22697 0
-22694 -22695  22696 -972 -22698 0
-22694 -22695  22696 -972  22699 0

c  -1+1 --> 0
c    ( b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0 ∧  p_972) -> (-b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧ -b^{243, 5}_0)
c  in CNF:
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_2
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_1
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_0
c  in DIMACS:
-22694  22695 -22696 -972 -22697 0
-22694  22695 -22696 -972 -22698 0
-22694  22695 -22696 -972 -22699 0

c  0+1 --> 1
c    (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧  p_972) -> (-b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧  b^{243, 5}_0)
c  in CNF:
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_2
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_1
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨  b^{243, 5}_0
c  in DIMACS:
 22694  22695  22696 -972 -22697 0
 22694  22695  22696 -972 -22698 0
 22694  22695  22696 -972  22699 0

c  1+1 --> 2
c    (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0 ∧  p_972) -> (-b^{243, 5}_2 ∧  b^{243, 5}_1 ∧ -b^{243, 5}_0)
c  in CNF:
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_2
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨  b^{243, 5}_1
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ -p_972 ∨ -b^{243, 5}_0
c  in DIMACS:
 22694  22695 -22696 -972 -22697 0
 22694  22695 -22696 -972  22698 0
 22694  22695 -22696 -972 -22699 0

c  2+1 --> break 
c    (-b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧  p_972) -> break
c  in CNF:
c     b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 22694 -22695  22696 -972 1162 0


c  2-1 --> 1
c    (-b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧ -p_972) -> (-b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧  b^{243, 5}_0)
c  in CNF:
c     b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_2
c     b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_1
c     b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨  b^{243, 5}_0
c  in DIMACS:
 22694 -22695  22696  972 -22697 0
 22694 -22695  22696  972 -22698 0
 22694 -22695  22696  972  22699 0

c  1-1 --> 0
c    (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0 ∧ -p_972) -> (-b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧ -b^{243, 5}_0)
c  in CNF:
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_2
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_1
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_0
c  in DIMACS:
 22694  22695 -22696  972 -22697 0
 22694  22695 -22696  972 -22698 0
 22694  22695 -22696  972 -22699 0

c  0-1 --> -1
c    (-b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧ -p_972) -> ( b^{243, 5}_2 ∧ -b^{243, 5}_1 ∧  b^{243, 5}_0)
c  in CNF:
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨  b^{243, 5}_2
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_1
c     b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨  b^{243, 5}_0
c  in DIMACS:
 22694  22695  22696  972  22697 0
 22694  22695  22696  972 -22698 0
 22694  22695  22696  972  22699 0

c  -1-1 --> -2
c    ( b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧  b^{243, 4}_0 ∧ -p_972) -> ( b^{243, 5}_2 ∧  b^{243, 5}_1 ∧ -b^{243, 5}_0)
c  in CNF:
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨  b^{243, 5}_2
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨  b^{243, 5}_1
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨  p_972 ∨ -b^{243, 5}_0
c  in DIMACS:
-22694  22695 -22696  972  22697 0
-22694  22695 -22696  972  22698 0
-22694  22695 -22696  972 -22699 0

c  -2-1 --> break 
c    ( b^{243, 4}_2 ∧  b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨  b^{243, 4}_0 ∨  p_972 ∨ break
c  in DIMACS:
-22694 -22695  22696  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{243, 4}_2 ∧ -b^{243, 4}_1 ∧ -b^{243, 4}_0 ∧ true) 
c  in CNF:
c    -b^{243, 4}_2 ∨  b^{243, 4}_1 ∨  b^{243, 4}_0 ∨ false 
c  in DIMACS:
-22694  22695  22696  0

c  3 does not represent an automaton state.
c    -(-b^{243, 4}_2 ∧  b^{243, 4}_1 ∧  b^{243, 4}_0 ∧ true) 
c  in CNF:
c     b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ false 
c  in DIMACS:
 22694 -22695 -22696  0
c  -3 does not represent an automaton state.
c    -( b^{243, 4}_2 ∧  b^{243, 4}_1 ∧  b^{243, 4}_0 ∧ true) 
c  in CNF:
c    -b^{243, 4}_2 ∨ -b^{243, 4}_1 ∨ -b^{243, 4}_0 ∨ false 
c  in DIMACS:
-22694 -22695 -22696  0

c INIT for k = 244
c    -b^{244, 1}_2
c    -b^{244, 1}_1
c    -b^{244, 1}_0
c  in DIMACS:
-22700 0
-22701 0
-22702 0

c Transitions for k = 244
c i = 1
c  -2+1 --> -1
c    ( b^{244, 1}_2 ∧  b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧  p_244) -> ( b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0)
c  in CNF:
c    -b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨  b^{244, 2}_2
c    -b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_1
c    -b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨  b^{244, 2}_0
c  in DIMACS:
-22700 -22701  22702 -244  22703 0
-22700 -22701  22702 -244 -22704 0
-22700 -22701  22702 -244  22705 0

c  -1+1 --> 0
c    ( b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧  b^{244, 1}_0 ∧  p_244) -> (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧ -b^{244, 2}_0)
c  in CNF:
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_2
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_1
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_0
c  in DIMACS:
-22700  22701 -22702 -244 -22703 0
-22700  22701 -22702 -244 -22704 0
-22700  22701 -22702 -244 -22705 0

c  0+1 --> 1
c    (-b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧  p_244) -> (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0)
c  in CNF:
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_2
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_1
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨  b^{244, 2}_0
c  in DIMACS:
 22700  22701  22702 -244 -22703 0
 22700  22701  22702 -244 -22704 0
 22700  22701  22702 -244  22705 0

c  1+1 --> 2
c    (-b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧  b^{244, 1}_0 ∧  p_244) -> (-b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0)
c  in CNF:
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_2
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨  b^{244, 2}_1
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ -p_244 ∨ -b^{244, 2}_0
c  in DIMACS:
 22700  22701 -22702 -244 -22703 0
 22700  22701 -22702 -244  22704 0
 22700  22701 -22702 -244 -22705 0

c  2+1 --> break 
c    (-b^{244, 1}_2 ∧  b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧  p_244) -> break
c  in CNF:
c     b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ -p_244 ∨ break
c  in DIMACS:
 22700 -22701  22702 -244 1162 0


c  2-1 --> 1
c    (-b^{244, 1}_2 ∧  b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧ -p_244) -> (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0)
c  in CNF:
c     b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_2
c     b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_1
c     b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨  b^{244, 2}_0
c  in DIMACS:
 22700 -22701  22702  244 -22703 0
 22700 -22701  22702  244 -22704 0
 22700 -22701  22702  244  22705 0

c  1-1 --> 0
c    (-b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧  b^{244, 1}_0 ∧ -p_244) -> (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧ -b^{244, 2}_0)
c  in CNF:
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_2
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_1
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_0
c  in DIMACS:
 22700  22701 -22702  244 -22703 0
 22700  22701 -22702  244 -22704 0
 22700  22701 -22702  244 -22705 0

c  0-1 --> -1
c    (-b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧ -p_244) -> ( b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0)
c  in CNF:
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨  b^{244, 2}_2
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_1
c     b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨  b^{244, 2}_0
c  in DIMACS:
 22700  22701  22702  244  22703 0
 22700  22701  22702  244 -22704 0
 22700  22701  22702  244  22705 0

c  -1-1 --> -2
c    ( b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧  b^{244, 1}_0 ∧ -p_244) -> ( b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0)
c  in CNF:
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨  b^{244, 2}_2
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨  b^{244, 2}_1
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨  p_244 ∨ -b^{244, 2}_0
c  in DIMACS:
-22700  22701 -22702  244  22703 0
-22700  22701 -22702  244  22704 0
-22700  22701 -22702  244 -22705 0

c  -2-1 --> break 
c    ( b^{244, 1}_2 ∧  b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧ -p_244) -> break
c  in CNF:
c    -b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨  b^{244, 1}_0 ∨  p_244 ∨ break
c  in DIMACS:
-22700 -22701  22702  244 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{244, 1}_2 ∧ -b^{244, 1}_1 ∧ -b^{244, 1}_0 ∧ true) 
c  in CNF:
c    -b^{244, 1}_2 ∨  b^{244, 1}_1 ∨  b^{244, 1}_0 ∨ false 
c  in DIMACS:
-22700  22701  22702  0

c  3 does not represent an automaton state.
c    -(-b^{244, 1}_2 ∧  b^{244, 1}_1 ∧  b^{244, 1}_0 ∧ true) 
c  in CNF:
c     b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ false 
c  in DIMACS:
 22700 -22701 -22702  0
c  -3 does not represent an automaton state.
c    -( b^{244, 1}_2 ∧  b^{244, 1}_1 ∧  b^{244, 1}_0 ∧ true) 
c  in CNF:
c    -b^{244, 1}_2 ∨ -b^{244, 1}_1 ∨ -b^{244, 1}_0 ∨ false 
c  in DIMACS:
-22700 -22701 -22702  0

c i = 2
c  -2+1 --> -1
c    ( b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧  p_488) -> ( b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0)
c  in CNF:
c    -b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨  b^{244, 3}_2
c    -b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_1
c    -b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨  b^{244, 3}_0
c  in DIMACS:
-22703 -22704  22705 -488  22706 0
-22703 -22704  22705 -488 -22707 0
-22703 -22704  22705 -488  22708 0

c  -1+1 --> 0
c    ( b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0 ∧  p_488) -> (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧ -b^{244, 3}_0)
c  in CNF:
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_2
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_1
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_0
c  in DIMACS:
-22703  22704 -22705 -488 -22706 0
-22703  22704 -22705 -488 -22707 0
-22703  22704 -22705 -488 -22708 0

c  0+1 --> 1
c    (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧  p_488) -> (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0)
c  in CNF:
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_2
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_1
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨  b^{244, 3}_0
c  in DIMACS:
 22703  22704  22705 -488 -22706 0
 22703  22704  22705 -488 -22707 0
 22703  22704  22705 -488  22708 0

c  1+1 --> 2
c    (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0 ∧  p_488) -> (-b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0)
c  in CNF:
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_2
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨  b^{244, 3}_1
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ -p_488 ∨ -b^{244, 3}_0
c  in DIMACS:
 22703  22704 -22705 -488 -22706 0
 22703  22704 -22705 -488  22707 0
 22703  22704 -22705 -488 -22708 0

c  2+1 --> break 
c    (-b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧  p_488) -> break
c  in CNF:
c     b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ -p_488 ∨ break
c  in DIMACS:
 22703 -22704  22705 -488 1162 0


c  2-1 --> 1
c    (-b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧ -p_488) -> (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0)
c  in CNF:
c     b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_2
c     b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_1
c     b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨  b^{244, 3}_0
c  in DIMACS:
 22703 -22704  22705  488 -22706 0
 22703 -22704  22705  488 -22707 0
 22703 -22704  22705  488  22708 0

c  1-1 --> 0
c    (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0 ∧ -p_488) -> (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧ -b^{244, 3}_0)
c  in CNF:
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_2
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_1
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_0
c  in DIMACS:
 22703  22704 -22705  488 -22706 0
 22703  22704 -22705  488 -22707 0
 22703  22704 -22705  488 -22708 0

c  0-1 --> -1
c    (-b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧ -p_488) -> ( b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0)
c  in CNF:
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨  b^{244, 3}_2
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_1
c     b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨  b^{244, 3}_0
c  in DIMACS:
 22703  22704  22705  488  22706 0
 22703  22704  22705  488 -22707 0
 22703  22704  22705  488  22708 0

c  -1-1 --> -2
c    ( b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧  b^{244, 2}_0 ∧ -p_488) -> ( b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0)
c  in CNF:
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨  b^{244, 3}_2
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨  b^{244, 3}_1
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨  p_488 ∨ -b^{244, 3}_0
c  in DIMACS:
-22703  22704 -22705  488  22706 0
-22703  22704 -22705  488  22707 0
-22703  22704 -22705  488 -22708 0

c  -2-1 --> break 
c    ( b^{244, 2}_2 ∧  b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧ -p_488) -> break
c  in CNF:
c    -b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨  b^{244, 2}_0 ∨  p_488 ∨ break
c  in DIMACS:
-22703 -22704  22705  488 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{244, 2}_2 ∧ -b^{244, 2}_1 ∧ -b^{244, 2}_0 ∧ true) 
c  in CNF:
c    -b^{244, 2}_2 ∨  b^{244, 2}_1 ∨  b^{244, 2}_0 ∨ false 
c  in DIMACS:
-22703  22704  22705  0

c  3 does not represent an automaton state.
c    -(-b^{244, 2}_2 ∧  b^{244, 2}_1 ∧  b^{244, 2}_0 ∧ true) 
c  in CNF:
c     b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ false 
c  in DIMACS:
 22703 -22704 -22705  0
c  -3 does not represent an automaton state.
c    -( b^{244, 2}_2 ∧  b^{244, 2}_1 ∧  b^{244, 2}_0 ∧ true) 
c  in CNF:
c    -b^{244, 2}_2 ∨ -b^{244, 2}_1 ∨ -b^{244, 2}_0 ∨ false 
c  in DIMACS:
-22703 -22704 -22705  0

c i = 3
c  -2+1 --> -1
c    ( b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧  p_732) -> ( b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0)
c  in CNF:
c    -b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨  b^{244, 4}_2
c    -b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_1
c    -b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨  b^{244, 4}_0
c  in DIMACS:
-22706 -22707  22708 -732  22709 0
-22706 -22707  22708 -732 -22710 0
-22706 -22707  22708 -732  22711 0

c  -1+1 --> 0
c    ( b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0 ∧  p_732) -> (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧ -b^{244, 4}_0)
c  in CNF:
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_2
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_1
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_0
c  in DIMACS:
-22706  22707 -22708 -732 -22709 0
-22706  22707 -22708 -732 -22710 0
-22706  22707 -22708 -732 -22711 0

c  0+1 --> 1
c    (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧  p_732) -> (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0)
c  in CNF:
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_2
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_1
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨  b^{244, 4}_0
c  in DIMACS:
 22706  22707  22708 -732 -22709 0
 22706  22707  22708 -732 -22710 0
 22706  22707  22708 -732  22711 0

c  1+1 --> 2
c    (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0 ∧  p_732) -> (-b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0)
c  in CNF:
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_2
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨  b^{244, 4}_1
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ -p_732 ∨ -b^{244, 4}_0
c  in DIMACS:
 22706  22707 -22708 -732 -22709 0
 22706  22707 -22708 -732  22710 0
 22706  22707 -22708 -732 -22711 0

c  2+1 --> break 
c    (-b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧  p_732) -> break
c  in CNF:
c     b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 22706 -22707  22708 -732 1162 0


c  2-1 --> 1
c    (-b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧ -p_732) -> (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0)
c  in CNF:
c     b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_2
c     b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_1
c     b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨  b^{244, 4}_0
c  in DIMACS:
 22706 -22707  22708  732 -22709 0
 22706 -22707  22708  732 -22710 0
 22706 -22707  22708  732  22711 0

c  1-1 --> 0
c    (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0 ∧ -p_732) -> (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧ -b^{244, 4}_0)
c  in CNF:
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_2
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_1
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_0
c  in DIMACS:
 22706  22707 -22708  732 -22709 0
 22706  22707 -22708  732 -22710 0
 22706  22707 -22708  732 -22711 0

c  0-1 --> -1
c    (-b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧ -p_732) -> ( b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0)
c  in CNF:
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨  b^{244, 4}_2
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_1
c     b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨  b^{244, 4}_0
c  in DIMACS:
 22706  22707  22708  732  22709 0
 22706  22707  22708  732 -22710 0
 22706  22707  22708  732  22711 0

c  -1-1 --> -2
c    ( b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧  b^{244, 3}_0 ∧ -p_732) -> ( b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0)
c  in CNF:
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨  b^{244, 4}_2
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨  b^{244, 4}_1
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨  p_732 ∨ -b^{244, 4}_0
c  in DIMACS:
-22706  22707 -22708  732  22709 0
-22706  22707 -22708  732  22710 0
-22706  22707 -22708  732 -22711 0

c  -2-1 --> break 
c    ( b^{244, 3}_2 ∧  b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨  b^{244, 3}_0 ∨  p_732 ∨ break
c  in DIMACS:
-22706 -22707  22708  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{244, 3}_2 ∧ -b^{244, 3}_1 ∧ -b^{244, 3}_0 ∧ true) 
c  in CNF:
c    -b^{244, 3}_2 ∨  b^{244, 3}_1 ∨  b^{244, 3}_0 ∨ false 
c  in DIMACS:
-22706  22707  22708  0

c  3 does not represent an automaton state.
c    -(-b^{244, 3}_2 ∧  b^{244, 3}_1 ∧  b^{244, 3}_0 ∧ true) 
c  in CNF:
c     b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ false 
c  in DIMACS:
 22706 -22707 -22708  0
c  -3 does not represent an automaton state.
c    -( b^{244, 3}_2 ∧  b^{244, 3}_1 ∧  b^{244, 3}_0 ∧ true) 
c  in CNF:
c    -b^{244, 3}_2 ∨ -b^{244, 3}_1 ∨ -b^{244, 3}_0 ∨ false 
c  in DIMACS:
-22706 -22707 -22708  0

c i = 4
c  -2+1 --> -1
c    ( b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧  p_976) -> ( b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧  b^{244, 5}_0)
c  in CNF:
c    -b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨  b^{244, 5}_2
c    -b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_1
c    -b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨  b^{244, 5}_0
c  in DIMACS:
-22709 -22710  22711 -976  22712 0
-22709 -22710  22711 -976 -22713 0
-22709 -22710  22711 -976  22714 0

c  -1+1 --> 0
c    ( b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0 ∧  p_976) -> (-b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧ -b^{244, 5}_0)
c  in CNF:
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_2
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_1
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_0
c  in DIMACS:
-22709  22710 -22711 -976 -22712 0
-22709  22710 -22711 -976 -22713 0
-22709  22710 -22711 -976 -22714 0

c  0+1 --> 1
c    (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧  p_976) -> (-b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧  b^{244, 5}_0)
c  in CNF:
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_2
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_1
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨  b^{244, 5}_0
c  in DIMACS:
 22709  22710  22711 -976 -22712 0
 22709  22710  22711 -976 -22713 0
 22709  22710  22711 -976  22714 0

c  1+1 --> 2
c    (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0 ∧  p_976) -> (-b^{244, 5}_2 ∧  b^{244, 5}_1 ∧ -b^{244, 5}_0)
c  in CNF:
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_2
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨  b^{244, 5}_1
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ -p_976 ∨ -b^{244, 5}_0
c  in DIMACS:
 22709  22710 -22711 -976 -22712 0
 22709  22710 -22711 -976  22713 0
 22709  22710 -22711 -976 -22714 0

c  2+1 --> break 
c    (-b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧  p_976) -> break
c  in CNF:
c     b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ -p_976 ∨ break
c  in DIMACS:
 22709 -22710  22711 -976 1162 0


c  2-1 --> 1
c    (-b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧ -p_976) -> (-b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧  b^{244, 5}_0)
c  in CNF:
c     b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_2
c     b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_1
c     b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨  b^{244, 5}_0
c  in DIMACS:
 22709 -22710  22711  976 -22712 0
 22709 -22710  22711  976 -22713 0
 22709 -22710  22711  976  22714 0

c  1-1 --> 0
c    (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0 ∧ -p_976) -> (-b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧ -b^{244, 5}_0)
c  in CNF:
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_2
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_1
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_0
c  in DIMACS:
 22709  22710 -22711  976 -22712 0
 22709  22710 -22711  976 -22713 0
 22709  22710 -22711  976 -22714 0

c  0-1 --> -1
c    (-b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧ -p_976) -> ( b^{244, 5}_2 ∧ -b^{244, 5}_1 ∧  b^{244, 5}_0)
c  in CNF:
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨  b^{244, 5}_2
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_1
c     b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨  b^{244, 5}_0
c  in DIMACS:
 22709  22710  22711  976  22712 0
 22709  22710  22711  976 -22713 0
 22709  22710  22711  976  22714 0

c  -1-1 --> -2
c    ( b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧  b^{244, 4}_0 ∧ -p_976) -> ( b^{244, 5}_2 ∧  b^{244, 5}_1 ∧ -b^{244, 5}_0)
c  in CNF:
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨  b^{244, 5}_2
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨  b^{244, 5}_1
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨  p_976 ∨ -b^{244, 5}_0
c  in DIMACS:
-22709  22710 -22711  976  22712 0
-22709  22710 -22711  976  22713 0
-22709  22710 -22711  976 -22714 0

c  -2-1 --> break 
c    ( b^{244, 4}_2 ∧  b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧ -p_976) -> break
c  in CNF:
c    -b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨  b^{244, 4}_0 ∨  p_976 ∨ break
c  in DIMACS:
-22709 -22710  22711  976 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{244, 4}_2 ∧ -b^{244, 4}_1 ∧ -b^{244, 4}_0 ∧ true) 
c  in CNF:
c    -b^{244, 4}_2 ∨  b^{244, 4}_1 ∨  b^{244, 4}_0 ∨ false 
c  in DIMACS:
-22709  22710  22711  0

c  3 does not represent an automaton state.
c    -(-b^{244, 4}_2 ∧  b^{244, 4}_1 ∧  b^{244, 4}_0 ∧ true) 
c  in CNF:
c     b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ false 
c  in DIMACS:
 22709 -22710 -22711  0
c  -3 does not represent an automaton state.
c    -( b^{244, 4}_2 ∧  b^{244, 4}_1 ∧  b^{244, 4}_0 ∧ true) 
c  in CNF:
c    -b^{244, 4}_2 ∨ -b^{244, 4}_1 ∨ -b^{244, 4}_0 ∨ false 
c  in DIMACS:
-22709 -22710 -22711  0

c INIT for k = 245
c    -b^{245, 1}_2
c    -b^{245, 1}_1
c    -b^{245, 1}_0
c  in DIMACS:
-22715 0
-22716 0
-22717 0

c Transitions for k = 245
c i = 1
c  -2+1 --> -1
c    ( b^{245, 1}_2 ∧  b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧  p_245) -> ( b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0)
c  in CNF:
c    -b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨  b^{245, 2}_2
c    -b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_1
c    -b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨  b^{245, 2}_0
c  in DIMACS:
-22715 -22716  22717 -245  22718 0
-22715 -22716  22717 -245 -22719 0
-22715 -22716  22717 -245  22720 0

c  -1+1 --> 0
c    ( b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧  b^{245, 1}_0 ∧  p_245) -> (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧ -b^{245, 2}_0)
c  in CNF:
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_2
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_1
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_0
c  in DIMACS:
-22715  22716 -22717 -245 -22718 0
-22715  22716 -22717 -245 -22719 0
-22715  22716 -22717 -245 -22720 0

c  0+1 --> 1
c    (-b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧  p_245) -> (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0)
c  in CNF:
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_2
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_1
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨  b^{245, 2}_0
c  in DIMACS:
 22715  22716  22717 -245 -22718 0
 22715  22716  22717 -245 -22719 0
 22715  22716  22717 -245  22720 0

c  1+1 --> 2
c    (-b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧  b^{245, 1}_0 ∧  p_245) -> (-b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0)
c  in CNF:
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_2
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨  b^{245, 2}_1
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ -p_245 ∨ -b^{245, 2}_0
c  in DIMACS:
 22715  22716 -22717 -245 -22718 0
 22715  22716 -22717 -245  22719 0
 22715  22716 -22717 -245 -22720 0

c  2+1 --> break 
c    (-b^{245, 1}_2 ∧  b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧  p_245) -> break
c  in CNF:
c     b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ -p_245 ∨ break
c  in DIMACS:
 22715 -22716  22717 -245 1162 0


c  2-1 --> 1
c    (-b^{245, 1}_2 ∧  b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧ -p_245) -> (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0)
c  in CNF:
c     b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_2
c     b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_1
c     b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨  b^{245, 2}_0
c  in DIMACS:
 22715 -22716  22717  245 -22718 0
 22715 -22716  22717  245 -22719 0
 22715 -22716  22717  245  22720 0

c  1-1 --> 0
c    (-b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧  b^{245, 1}_0 ∧ -p_245) -> (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧ -b^{245, 2}_0)
c  in CNF:
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_2
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_1
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_0
c  in DIMACS:
 22715  22716 -22717  245 -22718 0
 22715  22716 -22717  245 -22719 0
 22715  22716 -22717  245 -22720 0

c  0-1 --> -1
c    (-b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧ -p_245) -> ( b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0)
c  in CNF:
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨  b^{245, 2}_2
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_1
c     b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨  b^{245, 2}_0
c  in DIMACS:
 22715  22716  22717  245  22718 0
 22715  22716  22717  245 -22719 0
 22715  22716  22717  245  22720 0

c  -1-1 --> -2
c    ( b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧  b^{245, 1}_0 ∧ -p_245) -> ( b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0)
c  in CNF:
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨  b^{245, 2}_2
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨  b^{245, 2}_1
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨  p_245 ∨ -b^{245, 2}_0
c  in DIMACS:
-22715  22716 -22717  245  22718 0
-22715  22716 -22717  245  22719 0
-22715  22716 -22717  245 -22720 0

c  -2-1 --> break 
c    ( b^{245, 1}_2 ∧  b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧ -p_245) -> break
c  in CNF:
c    -b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨  b^{245, 1}_0 ∨  p_245 ∨ break
c  in DIMACS:
-22715 -22716  22717  245 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{245, 1}_2 ∧ -b^{245, 1}_1 ∧ -b^{245, 1}_0 ∧ true) 
c  in CNF:
c    -b^{245, 1}_2 ∨  b^{245, 1}_1 ∨  b^{245, 1}_0 ∨ false 
c  in DIMACS:
-22715  22716  22717  0

c  3 does not represent an automaton state.
c    -(-b^{245, 1}_2 ∧  b^{245, 1}_1 ∧  b^{245, 1}_0 ∧ true) 
c  in CNF:
c     b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ false 
c  in DIMACS:
 22715 -22716 -22717  0
c  -3 does not represent an automaton state.
c    -( b^{245, 1}_2 ∧  b^{245, 1}_1 ∧  b^{245, 1}_0 ∧ true) 
c  in CNF:
c    -b^{245, 1}_2 ∨ -b^{245, 1}_1 ∨ -b^{245, 1}_0 ∨ false 
c  in DIMACS:
-22715 -22716 -22717  0

c i = 2
c  -2+1 --> -1
c    ( b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧  p_490) -> ( b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0)
c  in CNF:
c    -b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨  b^{245, 3}_2
c    -b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_1
c    -b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨  b^{245, 3}_0
c  in DIMACS:
-22718 -22719  22720 -490  22721 0
-22718 -22719  22720 -490 -22722 0
-22718 -22719  22720 -490  22723 0

c  -1+1 --> 0
c    ( b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0 ∧  p_490) -> (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧ -b^{245, 3}_0)
c  in CNF:
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_2
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_1
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_0
c  in DIMACS:
-22718  22719 -22720 -490 -22721 0
-22718  22719 -22720 -490 -22722 0
-22718  22719 -22720 -490 -22723 0

c  0+1 --> 1
c    (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧  p_490) -> (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0)
c  in CNF:
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_2
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_1
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨  b^{245, 3}_0
c  in DIMACS:
 22718  22719  22720 -490 -22721 0
 22718  22719  22720 -490 -22722 0
 22718  22719  22720 -490  22723 0

c  1+1 --> 2
c    (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0 ∧  p_490) -> (-b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0)
c  in CNF:
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_2
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨  b^{245, 3}_1
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ -p_490 ∨ -b^{245, 3}_0
c  in DIMACS:
 22718  22719 -22720 -490 -22721 0
 22718  22719 -22720 -490  22722 0
 22718  22719 -22720 -490 -22723 0

c  2+1 --> break 
c    (-b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧  p_490) -> break
c  in CNF:
c     b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ -p_490 ∨ break
c  in DIMACS:
 22718 -22719  22720 -490 1162 0


c  2-1 --> 1
c    (-b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧ -p_490) -> (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0)
c  in CNF:
c     b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_2
c     b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_1
c     b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨  b^{245, 3}_0
c  in DIMACS:
 22718 -22719  22720  490 -22721 0
 22718 -22719  22720  490 -22722 0
 22718 -22719  22720  490  22723 0

c  1-1 --> 0
c    (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0 ∧ -p_490) -> (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧ -b^{245, 3}_0)
c  in CNF:
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_2
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_1
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_0
c  in DIMACS:
 22718  22719 -22720  490 -22721 0
 22718  22719 -22720  490 -22722 0
 22718  22719 -22720  490 -22723 0

c  0-1 --> -1
c    (-b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧ -p_490) -> ( b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0)
c  in CNF:
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨  b^{245, 3}_2
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_1
c     b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨  b^{245, 3}_0
c  in DIMACS:
 22718  22719  22720  490  22721 0
 22718  22719  22720  490 -22722 0
 22718  22719  22720  490  22723 0

c  -1-1 --> -2
c    ( b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧  b^{245, 2}_0 ∧ -p_490) -> ( b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0)
c  in CNF:
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨  b^{245, 3}_2
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨  b^{245, 3}_1
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨  p_490 ∨ -b^{245, 3}_0
c  in DIMACS:
-22718  22719 -22720  490  22721 0
-22718  22719 -22720  490  22722 0
-22718  22719 -22720  490 -22723 0

c  -2-1 --> break 
c    ( b^{245, 2}_2 ∧  b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧ -p_490) -> break
c  in CNF:
c    -b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨  b^{245, 2}_0 ∨  p_490 ∨ break
c  in DIMACS:
-22718 -22719  22720  490 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{245, 2}_2 ∧ -b^{245, 2}_1 ∧ -b^{245, 2}_0 ∧ true) 
c  in CNF:
c    -b^{245, 2}_2 ∨  b^{245, 2}_1 ∨  b^{245, 2}_0 ∨ false 
c  in DIMACS:
-22718  22719  22720  0

c  3 does not represent an automaton state.
c    -(-b^{245, 2}_2 ∧  b^{245, 2}_1 ∧  b^{245, 2}_0 ∧ true) 
c  in CNF:
c     b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ false 
c  in DIMACS:
 22718 -22719 -22720  0
c  -3 does not represent an automaton state.
c    -( b^{245, 2}_2 ∧  b^{245, 2}_1 ∧  b^{245, 2}_0 ∧ true) 
c  in CNF:
c    -b^{245, 2}_2 ∨ -b^{245, 2}_1 ∨ -b^{245, 2}_0 ∨ false 
c  in DIMACS:
-22718 -22719 -22720  0

c i = 3
c  -2+1 --> -1
c    ( b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧  p_735) -> ( b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0)
c  in CNF:
c    -b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨  b^{245, 4}_2
c    -b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_1
c    -b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨  b^{245, 4}_0
c  in DIMACS:
-22721 -22722  22723 -735  22724 0
-22721 -22722  22723 -735 -22725 0
-22721 -22722  22723 -735  22726 0

c  -1+1 --> 0
c    ( b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0 ∧  p_735) -> (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧ -b^{245, 4}_0)
c  in CNF:
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_2
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_1
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_0
c  in DIMACS:
-22721  22722 -22723 -735 -22724 0
-22721  22722 -22723 -735 -22725 0
-22721  22722 -22723 -735 -22726 0

c  0+1 --> 1
c    (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧  p_735) -> (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0)
c  in CNF:
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_2
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_1
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨  b^{245, 4}_0
c  in DIMACS:
 22721  22722  22723 -735 -22724 0
 22721  22722  22723 -735 -22725 0
 22721  22722  22723 -735  22726 0

c  1+1 --> 2
c    (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0 ∧  p_735) -> (-b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0)
c  in CNF:
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_2
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨  b^{245, 4}_1
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ -p_735 ∨ -b^{245, 4}_0
c  in DIMACS:
 22721  22722 -22723 -735 -22724 0
 22721  22722 -22723 -735  22725 0
 22721  22722 -22723 -735 -22726 0

c  2+1 --> break 
c    (-b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧  p_735) -> break
c  in CNF:
c     b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ -p_735 ∨ break
c  in DIMACS:
 22721 -22722  22723 -735 1162 0


c  2-1 --> 1
c    (-b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧ -p_735) -> (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0)
c  in CNF:
c     b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_2
c     b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_1
c     b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨  b^{245, 4}_0
c  in DIMACS:
 22721 -22722  22723  735 -22724 0
 22721 -22722  22723  735 -22725 0
 22721 -22722  22723  735  22726 0

c  1-1 --> 0
c    (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0 ∧ -p_735) -> (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧ -b^{245, 4}_0)
c  in CNF:
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_2
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_1
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_0
c  in DIMACS:
 22721  22722 -22723  735 -22724 0
 22721  22722 -22723  735 -22725 0
 22721  22722 -22723  735 -22726 0

c  0-1 --> -1
c    (-b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧ -p_735) -> ( b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0)
c  in CNF:
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨  b^{245, 4}_2
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_1
c     b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨  b^{245, 4}_0
c  in DIMACS:
 22721  22722  22723  735  22724 0
 22721  22722  22723  735 -22725 0
 22721  22722  22723  735  22726 0

c  -1-1 --> -2
c    ( b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧  b^{245, 3}_0 ∧ -p_735) -> ( b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0)
c  in CNF:
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨  b^{245, 4}_2
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨  b^{245, 4}_1
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨  p_735 ∨ -b^{245, 4}_0
c  in DIMACS:
-22721  22722 -22723  735  22724 0
-22721  22722 -22723  735  22725 0
-22721  22722 -22723  735 -22726 0

c  -2-1 --> break 
c    ( b^{245, 3}_2 ∧  b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧ -p_735) -> break
c  in CNF:
c    -b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨  b^{245, 3}_0 ∨  p_735 ∨ break
c  in DIMACS:
-22721 -22722  22723  735 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{245, 3}_2 ∧ -b^{245, 3}_1 ∧ -b^{245, 3}_0 ∧ true) 
c  in CNF:
c    -b^{245, 3}_2 ∨  b^{245, 3}_1 ∨  b^{245, 3}_0 ∨ false 
c  in DIMACS:
-22721  22722  22723  0

c  3 does not represent an automaton state.
c    -(-b^{245, 3}_2 ∧  b^{245, 3}_1 ∧  b^{245, 3}_0 ∧ true) 
c  in CNF:
c     b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ false 
c  in DIMACS:
 22721 -22722 -22723  0
c  -3 does not represent an automaton state.
c    -( b^{245, 3}_2 ∧  b^{245, 3}_1 ∧  b^{245, 3}_0 ∧ true) 
c  in CNF:
c    -b^{245, 3}_2 ∨ -b^{245, 3}_1 ∨ -b^{245, 3}_0 ∨ false 
c  in DIMACS:
-22721 -22722 -22723  0

c i = 4
c  -2+1 --> -1
c    ( b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧  p_980) -> ( b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧  b^{245, 5}_0)
c  in CNF:
c    -b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨  b^{245, 5}_2
c    -b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_1
c    -b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨  b^{245, 5}_0
c  in DIMACS:
-22724 -22725  22726 -980  22727 0
-22724 -22725  22726 -980 -22728 0
-22724 -22725  22726 -980  22729 0

c  -1+1 --> 0
c    ( b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0 ∧  p_980) -> (-b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧ -b^{245, 5}_0)
c  in CNF:
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_2
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_1
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_0
c  in DIMACS:
-22724  22725 -22726 -980 -22727 0
-22724  22725 -22726 -980 -22728 0
-22724  22725 -22726 -980 -22729 0

c  0+1 --> 1
c    (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧  p_980) -> (-b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧  b^{245, 5}_0)
c  in CNF:
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_2
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_1
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨  b^{245, 5}_0
c  in DIMACS:
 22724  22725  22726 -980 -22727 0
 22724  22725  22726 -980 -22728 0
 22724  22725  22726 -980  22729 0

c  1+1 --> 2
c    (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0 ∧  p_980) -> (-b^{245, 5}_2 ∧  b^{245, 5}_1 ∧ -b^{245, 5}_0)
c  in CNF:
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_2
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨  b^{245, 5}_1
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ -p_980 ∨ -b^{245, 5}_0
c  in DIMACS:
 22724  22725 -22726 -980 -22727 0
 22724  22725 -22726 -980  22728 0
 22724  22725 -22726 -980 -22729 0

c  2+1 --> break 
c    (-b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧  p_980) -> break
c  in CNF:
c     b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ -p_980 ∨ break
c  in DIMACS:
 22724 -22725  22726 -980 1162 0


c  2-1 --> 1
c    (-b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧ -p_980) -> (-b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧  b^{245, 5}_0)
c  in CNF:
c     b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_2
c     b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_1
c     b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨  b^{245, 5}_0
c  in DIMACS:
 22724 -22725  22726  980 -22727 0
 22724 -22725  22726  980 -22728 0
 22724 -22725  22726  980  22729 0

c  1-1 --> 0
c    (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0 ∧ -p_980) -> (-b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧ -b^{245, 5}_0)
c  in CNF:
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_2
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_1
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_0
c  in DIMACS:
 22724  22725 -22726  980 -22727 0
 22724  22725 -22726  980 -22728 0
 22724  22725 -22726  980 -22729 0

c  0-1 --> -1
c    (-b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧ -p_980) -> ( b^{245, 5}_2 ∧ -b^{245, 5}_1 ∧  b^{245, 5}_0)
c  in CNF:
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨  b^{245, 5}_2
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_1
c     b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨  b^{245, 5}_0
c  in DIMACS:
 22724  22725  22726  980  22727 0
 22724  22725  22726  980 -22728 0
 22724  22725  22726  980  22729 0

c  -1-1 --> -2
c    ( b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧  b^{245, 4}_0 ∧ -p_980) -> ( b^{245, 5}_2 ∧  b^{245, 5}_1 ∧ -b^{245, 5}_0)
c  in CNF:
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨  b^{245, 5}_2
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨  b^{245, 5}_1
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨  p_980 ∨ -b^{245, 5}_0
c  in DIMACS:
-22724  22725 -22726  980  22727 0
-22724  22725 -22726  980  22728 0
-22724  22725 -22726  980 -22729 0

c  -2-1 --> break 
c    ( b^{245, 4}_2 ∧  b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧ -p_980) -> break
c  in CNF:
c    -b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨  b^{245, 4}_0 ∨  p_980 ∨ break
c  in DIMACS:
-22724 -22725  22726  980 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{245, 4}_2 ∧ -b^{245, 4}_1 ∧ -b^{245, 4}_0 ∧ true) 
c  in CNF:
c    -b^{245, 4}_2 ∨  b^{245, 4}_1 ∨  b^{245, 4}_0 ∨ false 
c  in DIMACS:
-22724  22725  22726  0

c  3 does not represent an automaton state.
c    -(-b^{245, 4}_2 ∧  b^{245, 4}_1 ∧  b^{245, 4}_0 ∧ true) 
c  in CNF:
c     b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ false 
c  in DIMACS:
 22724 -22725 -22726  0
c  -3 does not represent an automaton state.
c    -( b^{245, 4}_2 ∧  b^{245, 4}_1 ∧  b^{245, 4}_0 ∧ true) 
c  in CNF:
c    -b^{245, 4}_2 ∨ -b^{245, 4}_1 ∨ -b^{245, 4}_0 ∨ false 
c  in DIMACS:
-22724 -22725 -22726  0

c INIT for k = 246
c    -b^{246, 1}_2
c    -b^{246, 1}_1
c    -b^{246, 1}_0
c  in DIMACS:
-22730 0
-22731 0
-22732 0

c Transitions for k = 246
c i = 1
c  -2+1 --> -1
c    ( b^{246, 1}_2 ∧  b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧  p_246) -> ( b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0)
c  in CNF:
c    -b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨  b^{246, 2}_2
c    -b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_1
c    -b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨  b^{246, 2}_0
c  in DIMACS:
-22730 -22731  22732 -246  22733 0
-22730 -22731  22732 -246 -22734 0
-22730 -22731  22732 -246  22735 0

c  -1+1 --> 0
c    ( b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧  b^{246, 1}_0 ∧  p_246) -> (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧ -b^{246, 2}_0)
c  in CNF:
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_2
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_1
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_0
c  in DIMACS:
-22730  22731 -22732 -246 -22733 0
-22730  22731 -22732 -246 -22734 0
-22730  22731 -22732 -246 -22735 0

c  0+1 --> 1
c    (-b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧  p_246) -> (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0)
c  in CNF:
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_2
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_1
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨  b^{246, 2}_0
c  in DIMACS:
 22730  22731  22732 -246 -22733 0
 22730  22731  22732 -246 -22734 0
 22730  22731  22732 -246  22735 0

c  1+1 --> 2
c    (-b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧  b^{246, 1}_0 ∧  p_246) -> (-b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0)
c  in CNF:
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_2
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨  b^{246, 2}_1
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ -p_246 ∨ -b^{246, 2}_0
c  in DIMACS:
 22730  22731 -22732 -246 -22733 0
 22730  22731 -22732 -246  22734 0
 22730  22731 -22732 -246 -22735 0

c  2+1 --> break 
c    (-b^{246, 1}_2 ∧  b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧  p_246) -> break
c  in CNF:
c     b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ -p_246 ∨ break
c  in DIMACS:
 22730 -22731  22732 -246 1162 0


c  2-1 --> 1
c    (-b^{246, 1}_2 ∧  b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧ -p_246) -> (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0)
c  in CNF:
c     b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_2
c     b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_1
c     b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨  b^{246, 2}_0
c  in DIMACS:
 22730 -22731  22732  246 -22733 0
 22730 -22731  22732  246 -22734 0
 22730 -22731  22732  246  22735 0

c  1-1 --> 0
c    (-b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧  b^{246, 1}_0 ∧ -p_246) -> (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧ -b^{246, 2}_0)
c  in CNF:
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_2
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_1
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_0
c  in DIMACS:
 22730  22731 -22732  246 -22733 0
 22730  22731 -22732  246 -22734 0
 22730  22731 -22732  246 -22735 0

c  0-1 --> -1
c    (-b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧ -p_246) -> ( b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0)
c  in CNF:
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨  b^{246, 2}_2
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_1
c     b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨  b^{246, 2}_0
c  in DIMACS:
 22730  22731  22732  246  22733 0
 22730  22731  22732  246 -22734 0
 22730  22731  22732  246  22735 0

c  -1-1 --> -2
c    ( b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧  b^{246, 1}_0 ∧ -p_246) -> ( b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0)
c  in CNF:
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨  b^{246, 2}_2
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨  b^{246, 2}_1
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨  p_246 ∨ -b^{246, 2}_0
c  in DIMACS:
-22730  22731 -22732  246  22733 0
-22730  22731 -22732  246  22734 0
-22730  22731 -22732  246 -22735 0

c  -2-1 --> break 
c    ( b^{246, 1}_2 ∧  b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧ -p_246) -> break
c  in CNF:
c    -b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨  b^{246, 1}_0 ∨  p_246 ∨ break
c  in DIMACS:
-22730 -22731  22732  246 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{246, 1}_2 ∧ -b^{246, 1}_1 ∧ -b^{246, 1}_0 ∧ true) 
c  in CNF:
c    -b^{246, 1}_2 ∨  b^{246, 1}_1 ∨  b^{246, 1}_0 ∨ false 
c  in DIMACS:
-22730  22731  22732  0

c  3 does not represent an automaton state.
c    -(-b^{246, 1}_2 ∧  b^{246, 1}_1 ∧  b^{246, 1}_0 ∧ true) 
c  in CNF:
c     b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ false 
c  in DIMACS:
 22730 -22731 -22732  0
c  -3 does not represent an automaton state.
c    -( b^{246, 1}_2 ∧  b^{246, 1}_1 ∧  b^{246, 1}_0 ∧ true) 
c  in CNF:
c    -b^{246, 1}_2 ∨ -b^{246, 1}_1 ∨ -b^{246, 1}_0 ∨ false 
c  in DIMACS:
-22730 -22731 -22732  0

c i = 2
c  -2+1 --> -1
c    ( b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧  p_492) -> ( b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0)
c  in CNF:
c    -b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨  b^{246, 3}_2
c    -b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_1
c    -b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨  b^{246, 3}_0
c  in DIMACS:
-22733 -22734  22735 -492  22736 0
-22733 -22734  22735 -492 -22737 0
-22733 -22734  22735 -492  22738 0

c  -1+1 --> 0
c    ( b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0 ∧  p_492) -> (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧ -b^{246, 3}_0)
c  in CNF:
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_2
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_1
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_0
c  in DIMACS:
-22733  22734 -22735 -492 -22736 0
-22733  22734 -22735 -492 -22737 0
-22733  22734 -22735 -492 -22738 0

c  0+1 --> 1
c    (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧  p_492) -> (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0)
c  in CNF:
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_2
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_1
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨  b^{246, 3}_0
c  in DIMACS:
 22733  22734  22735 -492 -22736 0
 22733  22734  22735 -492 -22737 0
 22733  22734  22735 -492  22738 0

c  1+1 --> 2
c    (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0 ∧  p_492) -> (-b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0)
c  in CNF:
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_2
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨  b^{246, 3}_1
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ -p_492 ∨ -b^{246, 3}_0
c  in DIMACS:
 22733  22734 -22735 -492 -22736 0
 22733  22734 -22735 -492  22737 0
 22733  22734 -22735 -492 -22738 0

c  2+1 --> break 
c    (-b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧  p_492) -> break
c  in CNF:
c     b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ -p_492 ∨ break
c  in DIMACS:
 22733 -22734  22735 -492 1162 0


c  2-1 --> 1
c    (-b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧ -p_492) -> (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0)
c  in CNF:
c     b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_2
c     b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_1
c     b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨  b^{246, 3}_0
c  in DIMACS:
 22733 -22734  22735  492 -22736 0
 22733 -22734  22735  492 -22737 0
 22733 -22734  22735  492  22738 0

c  1-1 --> 0
c    (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0 ∧ -p_492) -> (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧ -b^{246, 3}_0)
c  in CNF:
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_2
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_1
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_0
c  in DIMACS:
 22733  22734 -22735  492 -22736 0
 22733  22734 -22735  492 -22737 0
 22733  22734 -22735  492 -22738 0

c  0-1 --> -1
c    (-b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧ -p_492) -> ( b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0)
c  in CNF:
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨  b^{246, 3}_2
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_1
c     b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨  b^{246, 3}_0
c  in DIMACS:
 22733  22734  22735  492  22736 0
 22733  22734  22735  492 -22737 0
 22733  22734  22735  492  22738 0

c  -1-1 --> -2
c    ( b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧  b^{246, 2}_0 ∧ -p_492) -> ( b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0)
c  in CNF:
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨  b^{246, 3}_2
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨  b^{246, 3}_1
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨  p_492 ∨ -b^{246, 3}_0
c  in DIMACS:
-22733  22734 -22735  492  22736 0
-22733  22734 -22735  492  22737 0
-22733  22734 -22735  492 -22738 0

c  -2-1 --> break 
c    ( b^{246, 2}_2 ∧  b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧ -p_492) -> break
c  in CNF:
c    -b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨  b^{246, 2}_0 ∨  p_492 ∨ break
c  in DIMACS:
-22733 -22734  22735  492 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{246, 2}_2 ∧ -b^{246, 2}_1 ∧ -b^{246, 2}_0 ∧ true) 
c  in CNF:
c    -b^{246, 2}_2 ∨  b^{246, 2}_1 ∨  b^{246, 2}_0 ∨ false 
c  in DIMACS:
-22733  22734  22735  0

c  3 does not represent an automaton state.
c    -(-b^{246, 2}_2 ∧  b^{246, 2}_1 ∧  b^{246, 2}_0 ∧ true) 
c  in CNF:
c     b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ false 
c  in DIMACS:
 22733 -22734 -22735  0
c  -3 does not represent an automaton state.
c    -( b^{246, 2}_2 ∧  b^{246, 2}_1 ∧  b^{246, 2}_0 ∧ true) 
c  in CNF:
c    -b^{246, 2}_2 ∨ -b^{246, 2}_1 ∨ -b^{246, 2}_0 ∨ false 
c  in DIMACS:
-22733 -22734 -22735  0

c i = 3
c  -2+1 --> -1
c    ( b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧  p_738) -> ( b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0)
c  in CNF:
c    -b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨  b^{246, 4}_2
c    -b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_1
c    -b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨  b^{246, 4}_0
c  in DIMACS:
-22736 -22737  22738 -738  22739 0
-22736 -22737  22738 -738 -22740 0
-22736 -22737  22738 -738  22741 0

c  -1+1 --> 0
c    ( b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0 ∧  p_738) -> (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧ -b^{246, 4}_0)
c  in CNF:
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_2
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_1
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_0
c  in DIMACS:
-22736  22737 -22738 -738 -22739 0
-22736  22737 -22738 -738 -22740 0
-22736  22737 -22738 -738 -22741 0

c  0+1 --> 1
c    (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧  p_738) -> (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0)
c  in CNF:
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_2
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_1
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨  b^{246, 4}_0
c  in DIMACS:
 22736  22737  22738 -738 -22739 0
 22736  22737  22738 -738 -22740 0
 22736  22737  22738 -738  22741 0

c  1+1 --> 2
c    (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0 ∧  p_738) -> (-b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0)
c  in CNF:
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_2
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨  b^{246, 4}_1
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ -p_738 ∨ -b^{246, 4}_0
c  in DIMACS:
 22736  22737 -22738 -738 -22739 0
 22736  22737 -22738 -738  22740 0
 22736  22737 -22738 -738 -22741 0

c  2+1 --> break 
c    (-b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧  p_738) -> break
c  in CNF:
c     b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 22736 -22737  22738 -738 1162 0


c  2-1 --> 1
c    (-b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧ -p_738) -> (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0)
c  in CNF:
c     b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_2
c     b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_1
c     b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨  b^{246, 4}_0
c  in DIMACS:
 22736 -22737  22738  738 -22739 0
 22736 -22737  22738  738 -22740 0
 22736 -22737  22738  738  22741 0

c  1-1 --> 0
c    (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0 ∧ -p_738) -> (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧ -b^{246, 4}_0)
c  in CNF:
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_2
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_1
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_0
c  in DIMACS:
 22736  22737 -22738  738 -22739 0
 22736  22737 -22738  738 -22740 0
 22736  22737 -22738  738 -22741 0

c  0-1 --> -1
c    (-b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧ -p_738) -> ( b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0)
c  in CNF:
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨  b^{246, 4}_2
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_1
c     b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨  b^{246, 4}_0
c  in DIMACS:
 22736  22737  22738  738  22739 0
 22736  22737  22738  738 -22740 0
 22736  22737  22738  738  22741 0

c  -1-1 --> -2
c    ( b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧  b^{246, 3}_0 ∧ -p_738) -> ( b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0)
c  in CNF:
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨  b^{246, 4}_2
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨  b^{246, 4}_1
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨  p_738 ∨ -b^{246, 4}_0
c  in DIMACS:
-22736  22737 -22738  738  22739 0
-22736  22737 -22738  738  22740 0
-22736  22737 -22738  738 -22741 0

c  -2-1 --> break 
c    ( b^{246, 3}_2 ∧  b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨  b^{246, 3}_0 ∨  p_738 ∨ break
c  in DIMACS:
-22736 -22737  22738  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{246, 3}_2 ∧ -b^{246, 3}_1 ∧ -b^{246, 3}_0 ∧ true) 
c  in CNF:
c    -b^{246, 3}_2 ∨  b^{246, 3}_1 ∨  b^{246, 3}_0 ∨ false 
c  in DIMACS:
-22736  22737  22738  0

c  3 does not represent an automaton state.
c    -(-b^{246, 3}_2 ∧  b^{246, 3}_1 ∧  b^{246, 3}_0 ∧ true) 
c  in CNF:
c     b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ false 
c  in DIMACS:
 22736 -22737 -22738  0
c  -3 does not represent an automaton state.
c    -( b^{246, 3}_2 ∧  b^{246, 3}_1 ∧  b^{246, 3}_0 ∧ true) 
c  in CNF:
c    -b^{246, 3}_2 ∨ -b^{246, 3}_1 ∨ -b^{246, 3}_0 ∨ false 
c  in DIMACS:
-22736 -22737 -22738  0

c i = 4
c  -2+1 --> -1
c    ( b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧  p_984) -> ( b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧  b^{246, 5}_0)
c  in CNF:
c    -b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨  b^{246, 5}_2
c    -b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_1
c    -b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨  b^{246, 5}_0
c  in DIMACS:
-22739 -22740  22741 -984  22742 0
-22739 -22740  22741 -984 -22743 0
-22739 -22740  22741 -984  22744 0

c  -1+1 --> 0
c    ( b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0 ∧  p_984) -> (-b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧ -b^{246, 5}_0)
c  in CNF:
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_2
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_1
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_0
c  in DIMACS:
-22739  22740 -22741 -984 -22742 0
-22739  22740 -22741 -984 -22743 0
-22739  22740 -22741 -984 -22744 0

c  0+1 --> 1
c    (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧  p_984) -> (-b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧  b^{246, 5}_0)
c  in CNF:
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_2
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_1
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨  b^{246, 5}_0
c  in DIMACS:
 22739  22740  22741 -984 -22742 0
 22739  22740  22741 -984 -22743 0
 22739  22740  22741 -984  22744 0

c  1+1 --> 2
c    (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0 ∧  p_984) -> (-b^{246, 5}_2 ∧  b^{246, 5}_1 ∧ -b^{246, 5}_0)
c  in CNF:
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_2
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨  b^{246, 5}_1
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ -p_984 ∨ -b^{246, 5}_0
c  in DIMACS:
 22739  22740 -22741 -984 -22742 0
 22739  22740 -22741 -984  22743 0
 22739  22740 -22741 -984 -22744 0

c  2+1 --> break 
c    (-b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧  p_984) -> break
c  in CNF:
c     b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 22739 -22740  22741 -984 1162 0


c  2-1 --> 1
c    (-b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧ -p_984) -> (-b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧  b^{246, 5}_0)
c  in CNF:
c     b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_2
c     b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_1
c     b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨  b^{246, 5}_0
c  in DIMACS:
 22739 -22740  22741  984 -22742 0
 22739 -22740  22741  984 -22743 0
 22739 -22740  22741  984  22744 0

c  1-1 --> 0
c    (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0 ∧ -p_984) -> (-b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧ -b^{246, 5}_0)
c  in CNF:
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_2
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_1
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_0
c  in DIMACS:
 22739  22740 -22741  984 -22742 0
 22739  22740 -22741  984 -22743 0
 22739  22740 -22741  984 -22744 0

c  0-1 --> -1
c    (-b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧ -p_984) -> ( b^{246, 5}_2 ∧ -b^{246, 5}_1 ∧  b^{246, 5}_0)
c  in CNF:
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨  b^{246, 5}_2
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_1
c     b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨  b^{246, 5}_0
c  in DIMACS:
 22739  22740  22741  984  22742 0
 22739  22740  22741  984 -22743 0
 22739  22740  22741  984  22744 0

c  -1-1 --> -2
c    ( b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧  b^{246, 4}_0 ∧ -p_984) -> ( b^{246, 5}_2 ∧  b^{246, 5}_1 ∧ -b^{246, 5}_0)
c  in CNF:
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨  b^{246, 5}_2
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨  b^{246, 5}_1
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨  p_984 ∨ -b^{246, 5}_0
c  in DIMACS:
-22739  22740 -22741  984  22742 0
-22739  22740 -22741  984  22743 0
-22739  22740 -22741  984 -22744 0

c  -2-1 --> break 
c    ( b^{246, 4}_2 ∧  b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨  b^{246, 4}_0 ∨  p_984 ∨ break
c  in DIMACS:
-22739 -22740  22741  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{246, 4}_2 ∧ -b^{246, 4}_1 ∧ -b^{246, 4}_0 ∧ true) 
c  in CNF:
c    -b^{246, 4}_2 ∨  b^{246, 4}_1 ∨  b^{246, 4}_0 ∨ false 
c  in DIMACS:
-22739  22740  22741  0

c  3 does not represent an automaton state.
c    -(-b^{246, 4}_2 ∧  b^{246, 4}_1 ∧  b^{246, 4}_0 ∧ true) 
c  in CNF:
c     b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ false 
c  in DIMACS:
 22739 -22740 -22741  0
c  -3 does not represent an automaton state.
c    -( b^{246, 4}_2 ∧  b^{246, 4}_1 ∧  b^{246, 4}_0 ∧ true) 
c  in CNF:
c    -b^{246, 4}_2 ∨ -b^{246, 4}_1 ∨ -b^{246, 4}_0 ∨ false 
c  in DIMACS:
-22739 -22740 -22741  0

c INIT for k = 247
c    -b^{247, 1}_2
c    -b^{247, 1}_1
c    -b^{247, 1}_0
c  in DIMACS:
-22745 0
-22746 0
-22747 0

c Transitions for k = 247
c i = 1
c  -2+1 --> -1
c    ( b^{247, 1}_2 ∧  b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧  p_247) -> ( b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0)
c  in CNF:
c    -b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨  b^{247, 2}_2
c    -b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_1
c    -b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨  b^{247, 2}_0
c  in DIMACS:
-22745 -22746  22747 -247  22748 0
-22745 -22746  22747 -247 -22749 0
-22745 -22746  22747 -247  22750 0

c  -1+1 --> 0
c    ( b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧  b^{247, 1}_0 ∧  p_247) -> (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧ -b^{247, 2}_0)
c  in CNF:
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_2
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_1
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_0
c  in DIMACS:
-22745  22746 -22747 -247 -22748 0
-22745  22746 -22747 -247 -22749 0
-22745  22746 -22747 -247 -22750 0

c  0+1 --> 1
c    (-b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧  p_247) -> (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0)
c  in CNF:
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_2
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_1
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨  b^{247, 2}_0
c  in DIMACS:
 22745  22746  22747 -247 -22748 0
 22745  22746  22747 -247 -22749 0
 22745  22746  22747 -247  22750 0

c  1+1 --> 2
c    (-b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧  b^{247, 1}_0 ∧  p_247) -> (-b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0)
c  in CNF:
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_2
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨  b^{247, 2}_1
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ -p_247 ∨ -b^{247, 2}_0
c  in DIMACS:
 22745  22746 -22747 -247 -22748 0
 22745  22746 -22747 -247  22749 0
 22745  22746 -22747 -247 -22750 0

c  2+1 --> break 
c    (-b^{247, 1}_2 ∧  b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧  p_247) -> break
c  in CNF:
c     b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ -p_247 ∨ break
c  in DIMACS:
 22745 -22746  22747 -247 1162 0


c  2-1 --> 1
c    (-b^{247, 1}_2 ∧  b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧ -p_247) -> (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0)
c  in CNF:
c     b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_2
c     b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_1
c     b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨  b^{247, 2}_0
c  in DIMACS:
 22745 -22746  22747  247 -22748 0
 22745 -22746  22747  247 -22749 0
 22745 -22746  22747  247  22750 0

c  1-1 --> 0
c    (-b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧  b^{247, 1}_0 ∧ -p_247) -> (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧ -b^{247, 2}_0)
c  in CNF:
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_2
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_1
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_0
c  in DIMACS:
 22745  22746 -22747  247 -22748 0
 22745  22746 -22747  247 -22749 0
 22745  22746 -22747  247 -22750 0

c  0-1 --> -1
c    (-b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧ -p_247) -> ( b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0)
c  in CNF:
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨  b^{247, 2}_2
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_1
c     b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨  b^{247, 2}_0
c  in DIMACS:
 22745  22746  22747  247  22748 0
 22745  22746  22747  247 -22749 0
 22745  22746  22747  247  22750 0

c  -1-1 --> -2
c    ( b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧  b^{247, 1}_0 ∧ -p_247) -> ( b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0)
c  in CNF:
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨  b^{247, 2}_2
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨  b^{247, 2}_1
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨  p_247 ∨ -b^{247, 2}_0
c  in DIMACS:
-22745  22746 -22747  247  22748 0
-22745  22746 -22747  247  22749 0
-22745  22746 -22747  247 -22750 0

c  -2-1 --> break 
c    ( b^{247, 1}_2 ∧  b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧ -p_247) -> break
c  in CNF:
c    -b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨  b^{247, 1}_0 ∨  p_247 ∨ break
c  in DIMACS:
-22745 -22746  22747  247 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{247, 1}_2 ∧ -b^{247, 1}_1 ∧ -b^{247, 1}_0 ∧ true) 
c  in CNF:
c    -b^{247, 1}_2 ∨  b^{247, 1}_1 ∨  b^{247, 1}_0 ∨ false 
c  in DIMACS:
-22745  22746  22747  0

c  3 does not represent an automaton state.
c    -(-b^{247, 1}_2 ∧  b^{247, 1}_1 ∧  b^{247, 1}_0 ∧ true) 
c  in CNF:
c     b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ false 
c  in DIMACS:
 22745 -22746 -22747  0
c  -3 does not represent an automaton state.
c    -( b^{247, 1}_2 ∧  b^{247, 1}_1 ∧  b^{247, 1}_0 ∧ true) 
c  in CNF:
c    -b^{247, 1}_2 ∨ -b^{247, 1}_1 ∨ -b^{247, 1}_0 ∨ false 
c  in DIMACS:
-22745 -22746 -22747  0

c i = 2
c  -2+1 --> -1
c    ( b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧  p_494) -> ( b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0)
c  in CNF:
c    -b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨  b^{247, 3}_2
c    -b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_1
c    -b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨  b^{247, 3}_0
c  in DIMACS:
-22748 -22749  22750 -494  22751 0
-22748 -22749  22750 -494 -22752 0
-22748 -22749  22750 -494  22753 0

c  -1+1 --> 0
c    ( b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0 ∧  p_494) -> (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧ -b^{247, 3}_0)
c  in CNF:
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_2
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_1
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_0
c  in DIMACS:
-22748  22749 -22750 -494 -22751 0
-22748  22749 -22750 -494 -22752 0
-22748  22749 -22750 -494 -22753 0

c  0+1 --> 1
c    (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧  p_494) -> (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0)
c  in CNF:
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_2
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_1
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨  b^{247, 3}_0
c  in DIMACS:
 22748  22749  22750 -494 -22751 0
 22748  22749  22750 -494 -22752 0
 22748  22749  22750 -494  22753 0

c  1+1 --> 2
c    (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0 ∧  p_494) -> (-b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0)
c  in CNF:
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_2
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨  b^{247, 3}_1
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ -p_494 ∨ -b^{247, 3}_0
c  in DIMACS:
 22748  22749 -22750 -494 -22751 0
 22748  22749 -22750 -494  22752 0
 22748  22749 -22750 -494 -22753 0

c  2+1 --> break 
c    (-b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧  p_494) -> break
c  in CNF:
c     b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ -p_494 ∨ break
c  in DIMACS:
 22748 -22749  22750 -494 1162 0


c  2-1 --> 1
c    (-b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧ -p_494) -> (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0)
c  in CNF:
c     b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_2
c     b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_1
c     b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨  b^{247, 3}_0
c  in DIMACS:
 22748 -22749  22750  494 -22751 0
 22748 -22749  22750  494 -22752 0
 22748 -22749  22750  494  22753 0

c  1-1 --> 0
c    (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0 ∧ -p_494) -> (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧ -b^{247, 3}_0)
c  in CNF:
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_2
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_1
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_0
c  in DIMACS:
 22748  22749 -22750  494 -22751 0
 22748  22749 -22750  494 -22752 0
 22748  22749 -22750  494 -22753 0

c  0-1 --> -1
c    (-b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧ -p_494) -> ( b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0)
c  in CNF:
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨  b^{247, 3}_2
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_1
c     b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨  b^{247, 3}_0
c  in DIMACS:
 22748  22749  22750  494  22751 0
 22748  22749  22750  494 -22752 0
 22748  22749  22750  494  22753 0

c  -1-1 --> -2
c    ( b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧  b^{247, 2}_0 ∧ -p_494) -> ( b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0)
c  in CNF:
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨  b^{247, 3}_2
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨  b^{247, 3}_1
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨  p_494 ∨ -b^{247, 3}_0
c  in DIMACS:
-22748  22749 -22750  494  22751 0
-22748  22749 -22750  494  22752 0
-22748  22749 -22750  494 -22753 0

c  -2-1 --> break 
c    ( b^{247, 2}_2 ∧  b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧ -p_494) -> break
c  in CNF:
c    -b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨  b^{247, 2}_0 ∨  p_494 ∨ break
c  in DIMACS:
-22748 -22749  22750  494 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{247, 2}_2 ∧ -b^{247, 2}_1 ∧ -b^{247, 2}_0 ∧ true) 
c  in CNF:
c    -b^{247, 2}_2 ∨  b^{247, 2}_1 ∨  b^{247, 2}_0 ∨ false 
c  in DIMACS:
-22748  22749  22750  0

c  3 does not represent an automaton state.
c    -(-b^{247, 2}_2 ∧  b^{247, 2}_1 ∧  b^{247, 2}_0 ∧ true) 
c  in CNF:
c     b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ false 
c  in DIMACS:
 22748 -22749 -22750  0
c  -3 does not represent an automaton state.
c    -( b^{247, 2}_2 ∧  b^{247, 2}_1 ∧  b^{247, 2}_0 ∧ true) 
c  in CNF:
c    -b^{247, 2}_2 ∨ -b^{247, 2}_1 ∨ -b^{247, 2}_0 ∨ false 
c  in DIMACS:
-22748 -22749 -22750  0

c i = 3
c  -2+1 --> -1
c    ( b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧  p_741) -> ( b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0)
c  in CNF:
c    -b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨  b^{247, 4}_2
c    -b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_1
c    -b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨  b^{247, 4}_0
c  in DIMACS:
-22751 -22752  22753 -741  22754 0
-22751 -22752  22753 -741 -22755 0
-22751 -22752  22753 -741  22756 0

c  -1+1 --> 0
c    ( b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0 ∧  p_741) -> (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧ -b^{247, 4}_0)
c  in CNF:
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_2
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_1
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_0
c  in DIMACS:
-22751  22752 -22753 -741 -22754 0
-22751  22752 -22753 -741 -22755 0
-22751  22752 -22753 -741 -22756 0

c  0+1 --> 1
c    (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧  p_741) -> (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0)
c  in CNF:
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_2
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_1
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨  b^{247, 4}_0
c  in DIMACS:
 22751  22752  22753 -741 -22754 0
 22751  22752  22753 -741 -22755 0
 22751  22752  22753 -741  22756 0

c  1+1 --> 2
c    (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0 ∧  p_741) -> (-b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0)
c  in CNF:
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_2
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨  b^{247, 4}_1
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ -p_741 ∨ -b^{247, 4}_0
c  in DIMACS:
 22751  22752 -22753 -741 -22754 0
 22751  22752 -22753 -741  22755 0
 22751  22752 -22753 -741 -22756 0

c  2+1 --> break 
c    (-b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧  p_741) -> break
c  in CNF:
c     b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ -p_741 ∨ break
c  in DIMACS:
 22751 -22752  22753 -741 1162 0


c  2-1 --> 1
c    (-b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧ -p_741) -> (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0)
c  in CNF:
c     b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_2
c     b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_1
c     b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨  b^{247, 4}_0
c  in DIMACS:
 22751 -22752  22753  741 -22754 0
 22751 -22752  22753  741 -22755 0
 22751 -22752  22753  741  22756 0

c  1-1 --> 0
c    (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0 ∧ -p_741) -> (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧ -b^{247, 4}_0)
c  in CNF:
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_2
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_1
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_0
c  in DIMACS:
 22751  22752 -22753  741 -22754 0
 22751  22752 -22753  741 -22755 0
 22751  22752 -22753  741 -22756 0

c  0-1 --> -1
c    (-b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧ -p_741) -> ( b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0)
c  in CNF:
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨  b^{247, 4}_2
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_1
c     b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨  b^{247, 4}_0
c  in DIMACS:
 22751  22752  22753  741  22754 0
 22751  22752  22753  741 -22755 0
 22751  22752  22753  741  22756 0

c  -1-1 --> -2
c    ( b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧  b^{247, 3}_0 ∧ -p_741) -> ( b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0)
c  in CNF:
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨  b^{247, 4}_2
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨  b^{247, 4}_1
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨  p_741 ∨ -b^{247, 4}_0
c  in DIMACS:
-22751  22752 -22753  741  22754 0
-22751  22752 -22753  741  22755 0
-22751  22752 -22753  741 -22756 0

c  -2-1 --> break 
c    ( b^{247, 3}_2 ∧  b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧ -p_741) -> break
c  in CNF:
c    -b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨  b^{247, 3}_0 ∨  p_741 ∨ break
c  in DIMACS:
-22751 -22752  22753  741 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{247, 3}_2 ∧ -b^{247, 3}_1 ∧ -b^{247, 3}_0 ∧ true) 
c  in CNF:
c    -b^{247, 3}_2 ∨  b^{247, 3}_1 ∨  b^{247, 3}_0 ∨ false 
c  in DIMACS:
-22751  22752  22753  0

c  3 does not represent an automaton state.
c    -(-b^{247, 3}_2 ∧  b^{247, 3}_1 ∧  b^{247, 3}_0 ∧ true) 
c  in CNF:
c     b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ false 
c  in DIMACS:
 22751 -22752 -22753  0
c  -3 does not represent an automaton state.
c    -( b^{247, 3}_2 ∧  b^{247, 3}_1 ∧  b^{247, 3}_0 ∧ true) 
c  in CNF:
c    -b^{247, 3}_2 ∨ -b^{247, 3}_1 ∨ -b^{247, 3}_0 ∨ false 
c  in DIMACS:
-22751 -22752 -22753  0

c i = 4
c  -2+1 --> -1
c    ( b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧  p_988) -> ( b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧  b^{247, 5}_0)
c  in CNF:
c    -b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨  b^{247, 5}_2
c    -b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_1
c    -b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨  b^{247, 5}_0
c  in DIMACS:
-22754 -22755  22756 -988  22757 0
-22754 -22755  22756 -988 -22758 0
-22754 -22755  22756 -988  22759 0

c  -1+1 --> 0
c    ( b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0 ∧  p_988) -> (-b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧ -b^{247, 5}_0)
c  in CNF:
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_2
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_1
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_0
c  in DIMACS:
-22754  22755 -22756 -988 -22757 0
-22754  22755 -22756 -988 -22758 0
-22754  22755 -22756 -988 -22759 0

c  0+1 --> 1
c    (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧  p_988) -> (-b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧  b^{247, 5}_0)
c  in CNF:
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_2
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_1
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨  b^{247, 5}_0
c  in DIMACS:
 22754  22755  22756 -988 -22757 0
 22754  22755  22756 -988 -22758 0
 22754  22755  22756 -988  22759 0

c  1+1 --> 2
c    (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0 ∧  p_988) -> (-b^{247, 5}_2 ∧  b^{247, 5}_1 ∧ -b^{247, 5}_0)
c  in CNF:
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_2
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨  b^{247, 5}_1
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ -p_988 ∨ -b^{247, 5}_0
c  in DIMACS:
 22754  22755 -22756 -988 -22757 0
 22754  22755 -22756 -988  22758 0
 22754  22755 -22756 -988 -22759 0

c  2+1 --> break 
c    (-b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧  p_988) -> break
c  in CNF:
c     b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ -p_988 ∨ break
c  in DIMACS:
 22754 -22755  22756 -988 1162 0


c  2-1 --> 1
c    (-b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧ -p_988) -> (-b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧  b^{247, 5}_0)
c  in CNF:
c     b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_2
c     b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_1
c     b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨  b^{247, 5}_0
c  in DIMACS:
 22754 -22755  22756  988 -22757 0
 22754 -22755  22756  988 -22758 0
 22754 -22755  22756  988  22759 0

c  1-1 --> 0
c    (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0 ∧ -p_988) -> (-b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧ -b^{247, 5}_0)
c  in CNF:
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_2
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_1
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_0
c  in DIMACS:
 22754  22755 -22756  988 -22757 0
 22754  22755 -22756  988 -22758 0
 22754  22755 -22756  988 -22759 0

c  0-1 --> -1
c    (-b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧ -p_988) -> ( b^{247, 5}_2 ∧ -b^{247, 5}_1 ∧  b^{247, 5}_0)
c  in CNF:
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨  b^{247, 5}_2
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_1
c     b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨  b^{247, 5}_0
c  in DIMACS:
 22754  22755  22756  988  22757 0
 22754  22755  22756  988 -22758 0
 22754  22755  22756  988  22759 0

c  -1-1 --> -2
c    ( b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧  b^{247, 4}_0 ∧ -p_988) -> ( b^{247, 5}_2 ∧  b^{247, 5}_1 ∧ -b^{247, 5}_0)
c  in CNF:
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨  b^{247, 5}_2
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨  b^{247, 5}_1
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨  p_988 ∨ -b^{247, 5}_0
c  in DIMACS:
-22754  22755 -22756  988  22757 0
-22754  22755 -22756  988  22758 0
-22754  22755 -22756  988 -22759 0

c  -2-1 --> break 
c    ( b^{247, 4}_2 ∧  b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧ -p_988) -> break
c  in CNF:
c    -b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨  b^{247, 4}_0 ∨  p_988 ∨ break
c  in DIMACS:
-22754 -22755  22756  988 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{247, 4}_2 ∧ -b^{247, 4}_1 ∧ -b^{247, 4}_0 ∧ true) 
c  in CNF:
c    -b^{247, 4}_2 ∨  b^{247, 4}_1 ∨  b^{247, 4}_0 ∨ false 
c  in DIMACS:
-22754  22755  22756  0

c  3 does not represent an automaton state.
c    -(-b^{247, 4}_2 ∧  b^{247, 4}_1 ∧  b^{247, 4}_0 ∧ true) 
c  in CNF:
c     b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ false 
c  in DIMACS:
 22754 -22755 -22756  0
c  -3 does not represent an automaton state.
c    -( b^{247, 4}_2 ∧  b^{247, 4}_1 ∧  b^{247, 4}_0 ∧ true) 
c  in CNF:
c    -b^{247, 4}_2 ∨ -b^{247, 4}_1 ∨ -b^{247, 4}_0 ∨ false 
c  in DIMACS:
-22754 -22755 -22756  0

c INIT for k = 248
c    -b^{248, 1}_2
c    -b^{248, 1}_1
c    -b^{248, 1}_0
c  in DIMACS:
-22760 0
-22761 0
-22762 0

c Transitions for k = 248
c i = 1
c  -2+1 --> -1
c    ( b^{248, 1}_2 ∧  b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧  p_248) -> ( b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0)
c  in CNF:
c    -b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨  b^{248, 2}_2
c    -b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_1
c    -b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨  b^{248, 2}_0
c  in DIMACS:
-22760 -22761  22762 -248  22763 0
-22760 -22761  22762 -248 -22764 0
-22760 -22761  22762 -248  22765 0

c  -1+1 --> 0
c    ( b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧  b^{248, 1}_0 ∧  p_248) -> (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧ -b^{248, 2}_0)
c  in CNF:
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_2
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_1
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_0
c  in DIMACS:
-22760  22761 -22762 -248 -22763 0
-22760  22761 -22762 -248 -22764 0
-22760  22761 -22762 -248 -22765 0

c  0+1 --> 1
c    (-b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧  p_248) -> (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0)
c  in CNF:
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_2
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_1
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨  b^{248, 2}_0
c  in DIMACS:
 22760  22761  22762 -248 -22763 0
 22760  22761  22762 -248 -22764 0
 22760  22761  22762 -248  22765 0

c  1+1 --> 2
c    (-b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧  b^{248, 1}_0 ∧  p_248) -> (-b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0)
c  in CNF:
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_2
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨  b^{248, 2}_1
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ -p_248 ∨ -b^{248, 2}_0
c  in DIMACS:
 22760  22761 -22762 -248 -22763 0
 22760  22761 -22762 -248  22764 0
 22760  22761 -22762 -248 -22765 0

c  2+1 --> break 
c    (-b^{248, 1}_2 ∧  b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧  p_248) -> break
c  in CNF:
c     b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ -p_248 ∨ break
c  in DIMACS:
 22760 -22761  22762 -248 1162 0


c  2-1 --> 1
c    (-b^{248, 1}_2 ∧  b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧ -p_248) -> (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0)
c  in CNF:
c     b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_2
c     b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_1
c     b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨  b^{248, 2}_0
c  in DIMACS:
 22760 -22761  22762  248 -22763 0
 22760 -22761  22762  248 -22764 0
 22760 -22761  22762  248  22765 0

c  1-1 --> 0
c    (-b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧  b^{248, 1}_0 ∧ -p_248) -> (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧ -b^{248, 2}_0)
c  in CNF:
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_2
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_1
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_0
c  in DIMACS:
 22760  22761 -22762  248 -22763 0
 22760  22761 -22762  248 -22764 0
 22760  22761 -22762  248 -22765 0

c  0-1 --> -1
c    (-b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧ -p_248) -> ( b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0)
c  in CNF:
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨  b^{248, 2}_2
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_1
c     b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨  b^{248, 2}_0
c  in DIMACS:
 22760  22761  22762  248  22763 0
 22760  22761  22762  248 -22764 0
 22760  22761  22762  248  22765 0

c  -1-1 --> -2
c    ( b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧  b^{248, 1}_0 ∧ -p_248) -> ( b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0)
c  in CNF:
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨  b^{248, 2}_2
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨  b^{248, 2}_1
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨  p_248 ∨ -b^{248, 2}_0
c  in DIMACS:
-22760  22761 -22762  248  22763 0
-22760  22761 -22762  248  22764 0
-22760  22761 -22762  248 -22765 0

c  -2-1 --> break 
c    ( b^{248, 1}_2 ∧  b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧ -p_248) -> break
c  in CNF:
c    -b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨  b^{248, 1}_0 ∨  p_248 ∨ break
c  in DIMACS:
-22760 -22761  22762  248 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{248, 1}_2 ∧ -b^{248, 1}_1 ∧ -b^{248, 1}_0 ∧ true) 
c  in CNF:
c    -b^{248, 1}_2 ∨  b^{248, 1}_1 ∨  b^{248, 1}_0 ∨ false 
c  in DIMACS:
-22760  22761  22762  0

c  3 does not represent an automaton state.
c    -(-b^{248, 1}_2 ∧  b^{248, 1}_1 ∧  b^{248, 1}_0 ∧ true) 
c  in CNF:
c     b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ false 
c  in DIMACS:
 22760 -22761 -22762  0
c  -3 does not represent an automaton state.
c    -( b^{248, 1}_2 ∧  b^{248, 1}_1 ∧  b^{248, 1}_0 ∧ true) 
c  in CNF:
c    -b^{248, 1}_2 ∨ -b^{248, 1}_1 ∨ -b^{248, 1}_0 ∨ false 
c  in DIMACS:
-22760 -22761 -22762  0

c i = 2
c  -2+1 --> -1
c    ( b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧  p_496) -> ( b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0)
c  in CNF:
c    -b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨  b^{248, 3}_2
c    -b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_1
c    -b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨  b^{248, 3}_0
c  in DIMACS:
-22763 -22764  22765 -496  22766 0
-22763 -22764  22765 -496 -22767 0
-22763 -22764  22765 -496  22768 0

c  -1+1 --> 0
c    ( b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0 ∧  p_496) -> (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧ -b^{248, 3}_0)
c  in CNF:
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_2
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_1
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_0
c  in DIMACS:
-22763  22764 -22765 -496 -22766 0
-22763  22764 -22765 -496 -22767 0
-22763  22764 -22765 -496 -22768 0

c  0+1 --> 1
c    (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧  p_496) -> (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0)
c  in CNF:
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_2
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_1
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨  b^{248, 3}_0
c  in DIMACS:
 22763  22764  22765 -496 -22766 0
 22763  22764  22765 -496 -22767 0
 22763  22764  22765 -496  22768 0

c  1+1 --> 2
c    (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0 ∧  p_496) -> (-b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0)
c  in CNF:
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_2
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨  b^{248, 3}_1
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ -p_496 ∨ -b^{248, 3}_0
c  in DIMACS:
 22763  22764 -22765 -496 -22766 0
 22763  22764 -22765 -496  22767 0
 22763  22764 -22765 -496 -22768 0

c  2+1 --> break 
c    (-b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧  p_496) -> break
c  in CNF:
c     b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ -p_496 ∨ break
c  in DIMACS:
 22763 -22764  22765 -496 1162 0


c  2-1 --> 1
c    (-b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧ -p_496) -> (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0)
c  in CNF:
c     b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_2
c     b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_1
c     b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨  b^{248, 3}_0
c  in DIMACS:
 22763 -22764  22765  496 -22766 0
 22763 -22764  22765  496 -22767 0
 22763 -22764  22765  496  22768 0

c  1-1 --> 0
c    (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0 ∧ -p_496) -> (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧ -b^{248, 3}_0)
c  in CNF:
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_2
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_1
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_0
c  in DIMACS:
 22763  22764 -22765  496 -22766 0
 22763  22764 -22765  496 -22767 0
 22763  22764 -22765  496 -22768 0

c  0-1 --> -1
c    (-b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧ -p_496) -> ( b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0)
c  in CNF:
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨  b^{248, 3}_2
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_1
c     b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨  b^{248, 3}_0
c  in DIMACS:
 22763  22764  22765  496  22766 0
 22763  22764  22765  496 -22767 0
 22763  22764  22765  496  22768 0

c  -1-1 --> -2
c    ( b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧  b^{248, 2}_0 ∧ -p_496) -> ( b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0)
c  in CNF:
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨  b^{248, 3}_2
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨  b^{248, 3}_1
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨  p_496 ∨ -b^{248, 3}_0
c  in DIMACS:
-22763  22764 -22765  496  22766 0
-22763  22764 -22765  496  22767 0
-22763  22764 -22765  496 -22768 0

c  -2-1 --> break 
c    ( b^{248, 2}_2 ∧  b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧ -p_496) -> break
c  in CNF:
c    -b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨  b^{248, 2}_0 ∨  p_496 ∨ break
c  in DIMACS:
-22763 -22764  22765  496 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{248, 2}_2 ∧ -b^{248, 2}_1 ∧ -b^{248, 2}_0 ∧ true) 
c  in CNF:
c    -b^{248, 2}_2 ∨  b^{248, 2}_1 ∨  b^{248, 2}_0 ∨ false 
c  in DIMACS:
-22763  22764  22765  0

c  3 does not represent an automaton state.
c    -(-b^{248, 2}_2 ∧  b^{248, 2}_1 ∧  b^{248, 2}_0 ∧ true) 
c  in CNF:
c     b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ false 
c  in DIMACS:
 22763 -22764 -22765  0
c  -3 does not represent an automaton state.
c    -( b^{248, 2}_2 ∧  b^{248, 2}_1 ∧  b^{248, 2}_0 ∧ true) 
c  in CNF:
c    -b^{248, 2}_2 ∨ -b^{248, 2}_1 ∨ -b^{248, 2}_0 ∨ false 
c  in DIMACS:
-22763 -22764 -22765  0

c i = 3
c  -2+1 --> -1
c    ( b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧  p_744) -> ( b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0)
c  in CNF:
c    -b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨  b^{248, 4}_2
c    -b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_1
c    -b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨  b^{248, 4}_0
c  in DIMACS:
-22766 -22767  22768 -744  22769 0
-22766 -22767  22768 -744 -22770 0
-22766 -22767  22768 -744  22771 0

c  -1+1 --> 0
c    ( b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0 ∧  p_744) -> (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧ -b^{248, 4}_0)
c  in CNF:
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_2
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_1
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_0
c  in DIMACS:
-22766  22767 -22768 -744 -22769 0
-22766  22767 -22768 -744 -22770 0
-22766  22767 -22768 -744 -22771 0

c  0+1 --> 1
c    (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧  p_744) -> (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0)
c  in CNF:
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_2
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_1
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨  b^{248, 4}_0
c  in DIMACS:
 22766  22767  22768 -744 -22769 0
 22766  22767  22768 -744 -22770 0
 22766  22767  22768 -744  22771 0

c  1+1 --> 2
c    (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0 ∧  p_744) -> (-b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0)
c  in CNF:
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_2
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨  b^{248, 4}_1
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ -p_744 ∨ -b^{248, 4}_0
c  in DIMACS:
 22766  22767 -22768 -744 -22769 0
 22766  22767 -22768 -744  22770 0
 22766  22767 -22768 -744 -22771 0

c  2+1 --> break 
c    (-b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧  p_744) -> break
c  in CNF:
c     b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 22766 -22767  22768 -744 1162 0


c  2-1 --> 1
c    (-b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧ -p_744) -> (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0)
c  in CNF:
c     b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_2
c     b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_1
c     b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨  b^{248, 4}_0
c  in DIMACS:
 22766 -22767  22768  744 -22769 0
 22766 -22767  22768  744 -22770 0
 22766 -22767  22768  744  22771 0

c  1-1 --> 0
c    (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0 ∧ -p_744) -> (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧ -b^{248, 4}_0)
c  in CNF:
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_2
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_1
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_0
c  in DIMACS:
 22766  22767 -22768  744 -22769 0
 22766  22767 -22768  744 -22770 0
 22766  22767 -22768  744 -22771 0

c  0-1 --> -1
c    (-b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧ -p_744) -> ( b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0)
c  in CNF:
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨  b^{248, 4}_2
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_1
c     b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨  b^{248, 4}_0
c  in DIMACS:
 22766  22767  22768  744  22769 0
 22766  22767  22768  744 -22770 0
 22766  22767  22768  744  22771 0

c  -1-1 --> -2
c    ( b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧  b^{248, 3}_0 ∧ -p_744) -> ( b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0)
c  in CNF:
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨  b^{248, 4}_2
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨  b^{248, 4}_1
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨  p_744 ∨ -b^{248, 4}_0
c  in DIMACS:
-22766  22767 -22768  744  22769 0
-22766  22767 -22768  744  22770 0
-22766  22767 -22768  744 -22771 0

c  -2-1 --> break 
c    ( b^{248, 3}_2 ∧  b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨  b^{248, 3}_0 ∨  p_744 ∨ break
c  in DIMACS:
-22766 -22767  22768  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{248, 3}_2 ∧ -b^{248, 3}_1 ∧ -b^{248, 3}_0 ∧ true) 
c  in CNF:
c    -b^{248, 3}_2 ∨  b^{248, 3}_1 ∨  b^{248, 3}_0 ∨ false 
c  in DIMACS:
-22766  22767  22768  0

c  3 does not represent an automaton state.
c    -(-b^{248, 3}_2 ∧  b^{248, 3}_1 ∧  b^{248, 3}_0 ∧ true) 
c  in CNF:
c     b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ false 
c  in DIMACS:
 22766 -22767 -22768  0
c  -3 does not represent an automaton state.
c    -( b^{248, 3}_2 ∧  b^{248, 3}_1 ∧  b^{248, 3}_0 ∧ true) 
c  in CNF:
c    -b^{248, 3}_2 ∨ -b^{248, 3}_1 ∨ -b^{248, 3}_0 ∨ false 
c  in DIMACS:
-22766 -22767 -22768  0

c i = 4
c  -2+1 --> -1
c    ( b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧  p_992) -> ( b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧  b^{248, 5}_0)
c  in CNF:
c    -b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨  b^{248, 5}_2
c    -b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_1
c    -b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨  b^{248, 5}_0
c  in DIMACS:
-22769 -22770  22771 -992  22772 0
-22769 -22770  22771 -992 -22773 0
-22769 -22770  22771 -992  22774 0

c  -1+1 --> 0
c    ( b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0 ∧  p_992) -> (-b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧ -b^{248, 5}_0)
c  in CNF:
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_2
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_1
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_0
c  in DIMACS:
-22769  22770 -22771 -992 -22772 0
-22769  22770 -22771 -992 -22773 0
-22769  22770 -22771 -992 -22774 0

c  0+1 --> 1
c    (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧  p_992) -> (-b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧  b^{248, 5}_0)
c  in CNF:
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_2
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_1
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨  b^{248, 5}_0
c  in DIMACS:
 22769  22770  22771 -992 -22772 0
 22769  22770  22771 -992 -22773 0
 22769  22770  22771 -992  22774 0

c  1+1 --> 2
c    (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0 ∧  p_992) -> (-b^{248, 5}_2 ∧  b^{248, 5}_1 ∧ -b^{248, 5}_0)
c  in CNF:
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_2
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨  b^{248, 5}_1
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ -p_992 ∨ -b^{248, 5}_0
c  in DIMACS:
 22769  22770 -22771 -992 -22772 0
 22769  22770 -22771 -992  22773 0
 22769  22770 -22771 -992 -22774 0

c  2+1 --> break 
c    (-b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧  p_992) -> break
c  in CNF:
c     b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ -p_992 ∨ break
c  in DIMACS:
 22769 -22770  22771 -992 1162 0


c  2-1 --> 1
c    (-b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧ -p_992) -> (-b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧  b^{248, 5}_0)
c  in CNF:
c     b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_2
c     b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_1
c     b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨  b^{248, 5}_0
c  in DIMACS:
 22769 -22770  22771  992 -22772 0
 22769 -22770  22771  992 -22773 0
 22769 -22770  22771  992  22774 0

c  1-1 --> 0
c    (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0 ∧ -p_992) -> (-b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧ -b^{248, 5}_0)
c  in CNF:
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_2
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_1
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_0
c  in DIMACS:
 22769  22770 -22771  992 -22772 0
 22769  22770 -22771  992 -22773 0
 22769  22770 -22771  992 -22774 0

c  0-1 --> -1
c    (-b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧ -p_992) -> ( b^{248, 5}_2 ∧ -b^{248, 5}_1 ∧  b^{248, 5}_0)
c  in CNF:
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨  b^{248, 5}_2
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_1
c     b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨  b^{248, 5}_0
c  in DIMACS:
 22769  22770  22771  992  22772 0
 22769  22770  22771  992 -22773 0
 22769  22770  22771  992  22774 0

c  -1-1 --> -2
c    ( b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧  b^{248, 4}_0 ∧ -p_992) -> ( b^{248, 5}_2 ∧  b^{248, 5}_1 ∧ -b^{248, 5}_0)
c  in CNF:
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨  b^{248, 5}_2
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨  b^{248, 5}_1
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨  p_992 ∨ -b^{248, 5}_0
c  in DIMACS:
-22769  22770 -22771  992  22772 0
-22769  22770 -22771  992  22773 0
-22769  22770 -22771  992 -22774 0

c  -2-1 --> break 
c    ( b^{248, 4}_2 ∧  b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧ -p_992) -> break
c  in CNF:
c    -b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨  b^{248, 4}_0 ∨  p_992 ∨ break
c  in DIMACS:
-22769 -22770  22771  992 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{248, 4}_2 ∧ -b^{248, 4}_1 ∧ -b^{248, 4}_0 ∧ true) 
c  in CNF:
c    -b^{248, 4}_2 ∨  b^{248, 4}_1 ∨  b^{248, 4}_0 ∨ false 
c  in DIMACS:
-22769  22770  22771  0

c  3 does not represent an automaton state.
c    -(-b^{248, 4}_2 ∧  b^{248, 4}_1 ∧  b^{248, 4}_0 ∧ true) 
c  in CNF:
c     b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ false 
c  in DIMACS:
 22769 -22770 -22771  0
c  -3 does not represent an automaton state.
c    -( b^{248, 4}_2 ∧  b^{248, 4}_1 ∧  b^{248, 4}_0 ∧ true) 
c  in CNF:
c    -b^{248, 4}_2 ∨ -b^{248, 4}_1 ∨ -b^{248, 4}_0 ∨ false 
c  in DIMACS:
-22769 -22770 -22771  0

c INIT for k = 249
c    -b^{249, 1}_2
c    -b^{249, 1}_1
c    -b^{249, 1}_0
c  in DIMACS:
-22775 0
-22776 0
-22777 0

c Transitions for k = 249
c i = 1
c  -2+1 --> -1
c    ( b^{249, 1}_2 ∧  b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧  p_249) -> ( b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0)
c  in CNF:
c    -b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨  b^{249, 2}_2
c    -b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_1
c    -b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨  b^{249, 2}_0
c  in DIMACS:
-22775 -22776  22777 -249  22778 0
-22775 -22776  22777 -249 -22779 0
-22775 -22776  22777 -249  22780 0

c  -1+1 --> 0
c    ( b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧  b^{249, 1}_0 ∧  p_249) -> (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧ -b^{249, 2}_0)
c  in CNF:
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_2
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_1
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_0
c  in DIMACS:
-22775  22776 -22777 -249 -22778 0
-22775  22776 -22777 -249 -22779 0
-22775  22776 -22777 -249 -22780 0

c  0+1 --> 1
c    (-b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧  p_249) -> (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0)
c  in CNF:
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_2
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_1
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨  b^{249, 2}_0
c  in DIMACS:
 22775  22776  22777 -249 -22778 0
 22775  22776  22777 -249 -22779 0
 22775  22776  22777 -249  22780 0

c  1+1 --> 2
c    (-b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧  b^{249, 1}_0 ∧  p_249) -> (-b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0)
c  in CNF:
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_2
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨  b^{249, 2}_1
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ -p_249 ∨ -b^{249, 2}_0
c  in DIMACS:
 22775  22776 -22777 -249 -22778 0
 22775  22776 -22777 -249  22779 0
 22775  22776 -22777 -249 -22780 0

c  2+1 --> break 
c    (-b^{249, 1}_2 ∧  b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧  p_249) -> break
c  in CNF:
c     b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ -p_249 ∨ break
c  in DIMACS:
 22775 -22776  22777 -249 1162 0


c  2-1 --> 1
c    (-b^{249, 1}_2 ∧  b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧ -p_249) -> (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0)
c  in CNF:
c     b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_2
c     b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_1
c     b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨  b^{249, 2}_0
c  in DIMACS:
 22775 -22776  22777  249 -22778 0
 22775 -22776  22777  249 -22779 0
 22775 -22776  22777  249  22780 0

c  1-1 --> 0
c    (-b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧  b^{249, 1}_0 ∧ -p_249) -> (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧ -b^{249, 2}_0)
c  in CNF:
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_2
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_1
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_0
c  in DIMACS:
 22775  22776 -22777  249 -22778 0
 22775  22776 -22777  249 -22779 0
 22775  22776 -22777  249 -22780 0

c  0-1 --> -1
c    (-b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧ -p_249) -> ( b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0)
c  in CNF:
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨  b^{249, 2}_2
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_1
c     b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨  b^{249, 2}_0
c  in DIMACS:
 22775  22776  22777  249  22778 0
 22775  22776  22777  249 -22779 0
 22775  22776  22777  249  22780 0

c  -1-1 --> -2
c    ( b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧  b^{249, 1}_0 ∧ -p_249) -> ( b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0)
c  in CNF:
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨  b^{249, 2}_2
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨  b^{249, 2}_1
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨  p_249 ∨ -b^{249, 2}_0
c  in DIMACS:
-22775  22776 -22777  249  22778 0
-22775  22776 -22777  249  22779 0
-22775  22776 -22777  249 -22780 0

c  -2-1 --> break 
c    ( b^{249, 1}_2 ∧  b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧ -p_249) -> break
c  in CNF:
c    -b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨  b^{249, 1}_0 ∨  p_249 ∨ break
c  in DIMACS:
-22775 -22776  22777  249 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{249, 1}_2 ∧ -b^{249, 1}_1 ∧ -b^{249, 1}_0 ∧ true) 
c  in CNF:
c    -b^{249, 1}_2 ∨  b^{249, 1}_1 ∨  b^{249, 1}_0 ∨ false 
c  in DIMACS:
-22775  22776  22777  0

c  3 does not represent an automaton state.
c    -(-b^{249, 1}_2 ∧  b^{249, 1}_1 ∧  b^{249, 1}_0 ∧ true) 
c  in CNF:
c     b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ false 
c  in DIMACS:
 22775 -22776 -22777  0
c  -3 does not represent an automaton state.
c    -( b^{249, 1}_2 ∧  b^{249, 1}_1 ∧  b^{249, 1}_0 ∧ true) 
c  in CNF:
c    -b^{249, 1}_2 ∨ -b^{249, 1}_1 ∨ -b^{249, 1}_0 ∨ false 
c  in DIMACS:
-22775 -22776 -22777  0

c i = 2
c  -2+1 --> -1
c    ( b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧  p_498) -> ( b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0)
c  in CNF:
c    -b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨  b^{249, 3}_2
c    -b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_1
c    -b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨  b^{249, 3}_0
c  in DIMACS:
-22778 -22779  22780 -498  22781 0
-22778 -22779  22780 -498 -22782 0
-22778 -22779  22780 -498  22783 0

c  -1+1 --> 0
c    ( b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0 ∧  p_498) -> (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧ -b^{249, 3}_0)
c  in CNF:
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_2
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_1
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_0
c  in DIMACS:
-22778  22779 -22780 -498 -22781 0
-22778  22779 -22780 -498 -22782 0
-22778  22779 -22780 -498 -22783 0

c  0+1 --> 1
c    (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧  p_498) -> (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0)
c  in CNF:
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_2
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_1
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨  b^{249, 3}_0
c  in DIMACS:
 22778  22779  22780 -498 -22781 0
 22778  22779  22780 -498 -22782 0
 22778  22779  22780 -498  22783 0

c  1+1 --> 2
c    (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0 ∧  p_498) -> (-b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0)
c  in CNF:
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_2
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨  b^{249, 3}_1
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ -p_498 ∨ -b^{249, 3}_0
c  in DIMACS:
 22778  22779 -22780 -498 -22781 0
 22778  22779 -22780 -498  22782 0
 22778  22779 -22780 -498 -22783 0

c  2+1 --> break 
c    (-b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧  p_498) -> break
c  in CNF:
c     b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ -p_498 ∨ break
c  in DIMACS:
 22778 -22779  22780 -498 1162 0


c  2-1 --> 1
c    (-b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧ -p_498) -> (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0)
c  in CNF:
c     b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_2
c     b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_1
c     b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨  b^{249, 3}_0
c  in DIMACS:
 22778 -22779  22780  498 -22781 0
 22778 -22779  22780  498 -22782 0
 22778 -22779  22780  498  22783 0

c  1-1 --> 0
c    (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0 ∧ -p_498) -> (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧ -b^{249, 3}_0)
c  in CNF:
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_2
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_1
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_0
c  in DIMACS:
 22778  22779 -22780  498 -22781 0
 22778  22779 -22780  498 -22782 0
 22778  22779 -22780  498 -22783 0

c  0-1 --> -1
c    (-b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧ -p_498) -> ( b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0)
c  in CNF:
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨  b^{249, 3}_2
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_1
c     b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨  b^{249, 3}_0
c  in DIMACS:
 22778  22779  22780  498  22781 0
 22778  22779  22780  498 -22782 0
 22778  22779  22780  498  22783 0

c  -1-1 --> -2
c    ( b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧  b^{249, 2}_0 ∧ -p_498) -> ( b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0)
c  in CNF:
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨  b^{249, 3}_2
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨  b^{249, 3}_1
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨  p_498 ∨ -b^{249, 3}_0
c  in DIMACS:
-22778  22779 -22780  498  22781 0
-22778  22779 -22780  498  22782 0
-22778  22779 -22780  498 -22783 0

c  -2-1 --> break 
c    ( b^{249, 2}_2 ∧  b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧ -p_498) -> break
c  in CNF:
c    -b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨  b^{249, 2}_0 ∨  p_498 ∨ break
c  in DIMACS:
-22778 -22779  22780  498 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{249, 2}_2 ∧ -b^{249, 2}_1 ∧ -b^{249, 2}_0 ∧ true) 
c  in CNF:
c    -b^{249, 2}_2 ∨  b^{249, 2}_1 ∨  b^{249, 2}_0 ∨ false 
c  in DIMACS:
-22778  22779  22780  0

c  3 does not represent an automaton state.
c    -(-b^{249, 2}_2 ∧  b^{249, 2}_1 ∧  b^{249, 2}_0 ∧ true) 
c  in CNF:
c     b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ false 
c  in DIMACS:
 22778 -22779 -22780  0
c  -3 does not represent an automaton state.
c    -( b^{249, 2}_2 ∧  b^{249, 2}_1 ∧  b^{249, 2}_0 ∧ true) 
c  in CNF:
c    -b^{249, 2}_2 ∨ -b^{249, 2}_1 ∨ -b^{249, 2}_0 ∨ false 
c  in DIMACS:
-22778 -22779 -22780  0

c i = 3
c  -2+1 --> -1
c    ( b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧  p_747) -> ( b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0)
c  in CNF:
c    -b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨  b^{249, 4}_2
c    -b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_1
c    -b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨  b^{249, 4}_0
c  in DIMACS:
-22781 -22782  22783 -747  22784 0
-22781 -22782  22783 -747 -22785 0
-22781 -22782  22783 -747  22786 0

c  -1+1 --> 0
c    ( b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0 ∧  p_747) -> (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧ -b^{249, 4}_0)
c  in CNF:
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_2
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_1
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_0
c  in DIMACS:
-22781  22782 -22783 -747 -22784 0
-22781  22782 -22783 -747 -22785 0
-22781  22782 -22783 -747 -22786 0

c  0+1 --> 1
c    (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧  p_747) -> (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0)
c  in CNF:
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_2
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_1
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨  b^{249, 4}_0
c  in DIMACS:
 22781  22782  22783 -747 -22784 0
 22781  22782  22783 -747 -22785 0
 22781  22782  22783 -747  22786 0

c  1+1 --> 2
c    (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0 ∧  p_747) -> (-b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0)
c  in CNF:
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_2
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨  b^{249, 4}_1
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ -p_747 ∨ -b^{249, 4}_0
c  in DIMACS:
 22781  22782 -22783 -747 -22784 0
 22781  22782 -22783 -747  22785 0
 22781  22782 -22783 -747 -22786 0

c  2+1 --> break 
c    (-b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧  p_747) -> break
c  in CNF:
c     b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ -p_747 ∨ break
c  in DIMACS:
 22781 -22782  22783 -747 1162 0


c  2-1 --> 1
c    (-b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧ -p_747) -> (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0)
c  in CNF:
c     b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_2
c     b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_1
c     b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨  b^{249, 4}_0
c  in DIMACS:
 22781 -22782  22783  747 -22784 0
 22781 -22782  22783  747 -22785 0
 22781 -22782  22783  747  22786 0

c  1-1 --> 0
c    (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0 ∧ -p_747) -> (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧ -b^{249, 4}_0)
c  in CNF:
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_2
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_1
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_0
c  in DIMACS:
 22781  22782 -22783  747 -22784 0
 22781  22782 -22783  747 -22785 0
 22781  22782 -22783  747 -22786 0

c  0-1 --> -1
c    (-b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧ -p_747) -> ( b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0)
c  in CNF:
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨  b^{249, 4}_2
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_1
c     b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨  b^{249, 4}_0
c  in DIMACS:
 22781  22782  22783  747  22784 0
 22781  22782  22783  747 -22785 0
 22781  22782  22783  747  22786 0

c  -1-1 --> -2
c    ( b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧  b^{249, 3}_0 ∧ -p_747) -> ( b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0)
c  in CNF:
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨  b^{249, 4}_2
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨  b^{249, 4}_1
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨  p_747 ∨ -b^{249, 4}_0
c  in DIMACS:
-22781  22782 -22783  747  22784 0
-22781  22782 -22783  747  22785 0
-22781  22782 -22783  747 -22786 0

c  -2-1 --> break 
c    ( b^{249, 3}_2 ∧  b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧ -p_747) -> break
c  in CNF:
c    -b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨  b^{249, 3}_0 ∨  p_747 ∨ break
c  in DIMACS:
-22781 -22782  22783  747 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{249, 3}_2 ∧ -b^{249, 3}_1 ∧ -b^{249, 3}_0 ∧ true) 
c  in CNF:
c    -b^{249, 3}_2 ∨  b^{249, 3}_1 ∨  b^{249, 3}_0 ∨ false 
c  in DIMACS:
-22781  22782  22783  0

c  3 does not represent an automaton state.
c    -(-b^{249, 3}_2 ∧  b^{249, 3}_1 ∧  b^{249, 3}_0 ∧ true) 
c  in CNF:
c     b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ false 
c  in DIMACS:
 22781 -22782 -22783  0
c  -3 does not represent an automaton state.
c    -( b^{249, 3}_2 ∧  b^{249, 3}_1 ∧  b^{249, 3}_0 ∧ true) 
c  in CNF:
c    -b^{249, 3}_2 ∨ -b^{249, 3}_1 ∨ -b^{249, 3}_0 ∨ false 
c  in DIMACS:
-22781 -22782 -22783  0

c i = 4
c  -2+1 --> -1
c    ( b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧  p_996) -> ( b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧  b^{249, 5}_0)
c  in CNF:
c    -b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨  b^{249, 5}_2
c    -b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_1
c    -b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨  b^{249, 5}_0
c  in DIMACS:
-22784 -22785  22786 -996  22787 0
-22784 -22785  22786 -996 -22788 0
-22784 -22785  22786 -996  22789 0

c  -1+1 --> 0
c    ( b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0 ∧  p_996) -> (-b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧ -b^{249, 5}_0)
c  in CNF:
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_2
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_1
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_0
c  in DIMACS:
-22784  22785 -22786 -996 -22787 0
-22784  22785 -22786 -996 -22788 0
-22784  22785 -22786 -996 -22789 0

c  0+1 --> 1
c    (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧  p_996) -> (-b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧  b^{249, 5}_0)
c  in CNF:
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_2
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_1
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨  b^{249, 5}_0
c  in DIMACS:
 22784  22785  22786 -996 -22787 0
 22784  22785  22786 -996 -22788 0
 22784  22785  22786 -996  22789 0

c  1+1 --> 2
c    (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0 ∧  p_996) -> (-b^{249, 5}_2 ∧  b^{249, 5}_1 ∧ -b^{249, 5}_0)
c  in CNF:
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_2
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨  b^{249, 5}_1
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ -p_996 ∨ -b^{249, 5}_0
c  in DIMACS:
 22784  22785 -22786 -996 -22787 0
 22784  22785 -22786 -996  22788 0
 22784  22785 -22786 -996 -22789 0

c  2+1 --> break 
c    (-b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧  p_996) -> break
c  in CNF:
c     b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 22784 -22785  22786 -996 1162 0


c  2-1 --> 1
c    (-b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧ -p_996) -> (-b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧  b^{249, 5}_0)
c  in CNF:
c     b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_2
c     b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_1
c     b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨  b^{249, 5}_0
c  in DIMACS:
 22784 -22785  22786  996 -22787 0
 22784 -22785  22786  996 -22788 0
 22784 -22785  22786  996  22789 0

c  1-1 --> 0
c    (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0 ∧ -p_996) -> (-b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧ -b^{249, 5}_0)
c  in CNF:
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_2
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_1
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_0
c  in DIMACS:
 22784  22785 -22786  996 -22787 0
 22784  22785 -22786  996 -22788 0
 22784  22785 -22786  996 -22789 0

c  0-1 --> -1
c    (-b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧ -p_996) -> ( b^{249, 5}_2 ∧ -b^{249, 5}_1 ∧  b^{249, 5}_0)
c  in CNF:
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨  b^{249, 5}_2
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_1
c     b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨  b^{249, 5}_0
c  in DIMACS:
 22784  22785  22786  996  22787 0
 22784  22785  22786  996 -22788 0
 22784  22785  22786  996  22789 0

c  -1-1 --> -2
c    ( b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧  b^{249, 4}_0 ∧ -p_996) -> ( b^{249, 5}_2 ∧  b^{249, 5}_1 ∧ -b^{249, 5}_0)
c  in CNF:
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨  b^{249, 5}_2
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨  b^{249, 5}_1
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨  p_996 ∨ -b^{249, 5}_0
c  in DIMACS:
-22784  22785 -22786  996  22787 0
-22784  22785 -22786  996  22788 0
-22784  22785 -22786  996 -22789 0

c  -2-1 --> break 
c    ( b^{249, 4}_2 ∧  b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨  b^{249, 4}_0 ∨  p_996 ∨ break
c  in DIMACS:
-22784 -22785  22786  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{249, 4}_2 ∧ -b^{249, 4}_1 ∧ -b^{249, 4}_0 ∧ true) 
c  in CNF:
c    -b^{249, 4}_2 ∨  b^{249, 4}_1 ∨  b^{249, 4}_0 ∨ false 
c  in DIMACS:
-22784  22785  22786  0

c  3 does not represent an automaton state.
c    -(-b^{249, 4}_2 ∧  b^{249, 4}_1 ∧  b^{249, 4}_0 ∧ true) 
c  in CNF:
c     b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ false 
c  in DIMACS:
 22784 -22785 -22786  0
c  -3 does not represent an automaton state.
c    -( b^{249, 4}_2 ∧  b^{249, 4}_1 ∧  b^{249, 4}_0 ∧ true) 
c  in CNF:
c    -b^{249, 4}_2 ∨ -b^{249, 4}_1 ∨ -b^{249, 4}_0 ∨ false 
c  in DIMACS:
-22784 -22785 -22786  0

c INIT for k = 250
c    -b^{250, 1}_2
c    -b^{250, 1}_1
c    -b^{250, 1}_0
c  in DIMACS:
-22790 0
-22791 0
-22792 0

c Transitions for k = 250
c i = 1
c  -2+1 --> -1
c    ( b^{250, 1}_2 ∧  b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧  p_250) -> ( b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0)
c  in CNF:
c    -b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨  b^{250, 2}_2
c    -b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_1
c    -b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨  b^{250, 2}_0
c  in DIMACS:
-22790 -22791  22792 -250  22793 0
-22790 -22791  22792 -250 -22794 0
-22790 -22791  22792 -250  22795 0

c  -1+1 --> 0
c    ( b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧  b^{250, 1}_0 ∧  p_250) -> (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧ -b^{250, 2}_0)
c  in CNF:
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_2
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_1
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_0
c  in DIMACS:
-22790  22791 -22792 -250 -22793 0
-22790  22791 -22792 -250 -22794 0
-22790  22791 -22792 -250 -22795 0

c  0+1 --> 1
c    (-b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧  p_250) -> (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0)
c  in CNF:
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_2
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_1
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨  b^{250, 2}_0
c  in DIMACS:
 22790  22791  22792 -250 -22793 0
 22790  22791  22792 -250 -22794 0
 22790  22791  22792 -250  22795 0

c  1+1 --> 2
c    (-b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧  b^{250, 1}_0 ∧  p_250) -> (-b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0)
c  in CNF:
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_2
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨  b^{250, 2}_1
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ -p_250 ∨ -b^{250, 2}_0
c  in DIMACS:
 22790  22791 -22792 -250 -22793 0
 22790  22791 -22792 -250  22794 0
 22790  22791 -22792 -250 -22795 0

c  2+1 --> break 
c    (-b^{250, 1}_2 ∧  b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧  p_250) -> break
c  in CNF:
c     b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ -p_250 ∨ break
c  in DIMACS:
 22790 -22791  22792 -250 1162 0


c  2-1 --> 1
c    (-b^{250, 1}_2 ∧  b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧ -p_250) -> (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0)
c  in CNF:
c     b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_2
c     b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_1
c     b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨  b^{250, 2}_0
c  in DIMACS:
 22790 -22791  22792  250 -22793 0
 22790 -22791  22792  250 -22794 0
 22790 -22791  22792  250  22795 0

c  1-1 --> 0
c    (-b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧  b^{250, 1}_0 ∧ -p_250) -> (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧ -b^{250, 2}_0)
c  in CNF:
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_2
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_1
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_0
c  in DIMACS:
 22790  22791 -22792  250 -22793 0
 22790  22791 -22792  250 -22794 0
 22790  22791 -22792  250 -22795 0

c  0-1 --> -1
c    (-b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧ -p_250) -> ( b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0)
c  in CNF:
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨  b^{250, 2}_2
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_1
c     b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨  b^{250, 2}_0
c  in DIMACS:
 22790  22791  22792  250  22793 0
 22790  22791  22792  250 -22794 0
 22790  22791  22792  250  22795 0

c  -1-1 --> -2
c    ( b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧  b^{250, 1}_0 ∧ -p_250) -> ( b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0)
c  in CNF:
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨  b^{250, 2}_2
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨  b^{250, 2}_1
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨  p_250 ∨ -b^{250, 2}_0
c  in DIMACS:
-22790  22791 -22792  250  22793 0
-22790  22791 -22792  250  22794 0
-22790  22791 -22792  250 -22795 0

c  -2-1 --> break 
c    ( b^{250, 1}_2 ∧  b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧ -p_250) -> break
c  in CNF:
c    -b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨  b^{250, 1}_0 ∨  p_250 ∨ break
c  in DIMACS:
-22790 -22791  22792  250 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{250, 1}_2 ∧ -b^{250, 1}_1 ∧ -b^{250, 1}_0 ∧ true) 
c  in CNF:
c    -b^{250, 1}_2 ∨  b^{250, 1}_1 ∨  b^{250, 1}_0 ∨ false 
c  in DIMACS:
-22790  22791  22792  0

c  3 does not represent an automaton state.
c    -(-b^{250, 1}_2 ∧  b^{250, 1}_1 ∧  b^{250, 1}_0 ∧ true) 
c  in CNF:
c     b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ false 
c  in DIMACS:
 22790 -22791 -22792  0
c  -3 does not represent an automaton state.
c    -( b^{250, 1}_2 ∧  b^{250, 1}_1 ∧  b^{250, 1}_0 ∧ true) 
c  in CNF:
c    -b^{250, 1}_2 ∨ -b^{250, 1}_1 ∨ -b^{250, 1}_0 ∨ false 
c  in DIMACS:
-22790 -22791 -22792  0

c i = 2
c  -2+1 --> -1
c    ( b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧  p_500) -> ( b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0)
c  in CNF:
c    -b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨  b^{250, 3}_2
c    -b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_1
c    -b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨  b^{250, 3}_0
c  in DIMACS:
-22793 -22794  22795 -500  22796 0
-22793 -22794  22795 -500 -22797 0
-22793 -22794  22795 -500  22798 0

c  -1+1 --> 0
c    ( b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0 ∧  p_500) -> (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧ -b^{250, 3}_0)
c  in CNF:
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_2
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_1
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_0
c  in DIMACS:
-22793  22794 -22795 -500 -22796 0
-22793  22794 -22795 -500 -22797 0
-22793  22794 -22795 -500 -22798 0

c  0+1 --> 1
c    (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧  p_500) -> (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0)
c  in CNF:
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_2
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_1
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨  b^{250, 3}_0
c  in DIMACS:
 22793  22794  22795 -500 -22796 0
 22793  22794  22795 -500 -22797 0
 22793  22794  22795 -500  22798 0

c  1+1 --> 2
c    (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0 ∧  p_500) -> (-b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0)
c  in CNF:
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_2
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨  b^{250, 3}_1
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ -p_500 ∨ -b^{250, 3}_0
c  in DIMACS:
 22793  22794 -22795 -500 -22796 0
 22793  22794 -22795 -500  22797 0
 22793  22794 -22795 -500 -22798 0

c  2+1 --> break 
c    (-b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧  p_500) -> break
c  in CNF:
c     b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ -p_500 ∨ break
c  in DIMACS:
 22793 -22794  22795 -500 1162 0


c  2-1 --> 1
c    (-b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧ -p_500) -> (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0)
c  in CNF:
c     b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_2
c     b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_1
c     b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨  b^{250, 3}_0
c  in DIMACS:
 22793 -22794  22795  500 -22796 0
 22793 -22794  22795  500 -22797 0
 22793 -22794  22795  500  22798 0

c  1-1 --> 0
c    (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0 ∧ -p_500) -> (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧ -b^{250, 3}_0)
c  in CNF:
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_2
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_1
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_0
c  in DIMACS:
 22793  22794 -22795  500 -22796 0
 22793  22794 -22795  500 -22797 0
 22793  22794 -22795  500 -22798 0

c  0-1 --> -1
c    (-b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧ -p_500) -> ( b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0)
c  in CNF:
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨  b^{250, 3}_2
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_1
c     b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨  b^{250, 3}_0
c  in DIMACS:
 22793  22794  22795  500  22796 0
 22793  22794  22795  500 -22797 0
 22793  22794  22795  500  22798 0

c  -1-1 --> -2
c    ( b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧  b^{250, 2}_0 ∧ -p_500) -> ( b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0)
c  in CNF:
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨  b^{250, 3}_2
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨  b^{250, 3}_1
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨  p_500 ∨ -b^{250, 3}_0
c  in DIMACS:
-22793  22794 -22795  500  22796 0
-22793  22794 -22795  500  22797 0
-22793  22794 -22795  500 -22798 0

c  -2-1 --> break 
c    ( b^{250, 2}_2 ∧  b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧ -p_500) -> break
c  in CNF:
c    -b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨  b^{250, 2}_0 ∨  p_500 ∨ break
c  in DIMACS:
-22793 -22794  22795  500 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{250, 2}_2 ∧ -b^{250, 2}_1 ∧ -b^{250, 2}_0 ∧ true) 
c  in CNF:
c    -b^{250, 2}_2 ∨  b^{250, 2}_1 ∨  b^{250, 2}_0 ∨ false 
c  in DIMACS:
-22793  22794  22795  0

c  3 does not represent an automaton state.
c    -(-b^{250, 2}_2 ∧  b^{250, 2}_1 ∧  b^{250, 2}_0 ∧ true) 
c  in CNF:
c     b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ false 
c  in DIMACS:
 22793 -22794 -22795  0
c  -3 does not represent an automaton state.
c    -( b^{250, 2}_2 ∧  b^{250, 2}_1 ∧  b^{250, 2}_0 ∧ true) 
c  in CNF:
c    -b^{250, 2}_2 ∨ -b^{250, 2}_1 ∨ -b^{250, 2}_0 ∨ false 
c  in DIMACS:
-22793 -22794 -22795  0

c i = 3
c  -2+1 --> -1
c    ( b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧  p_750) -> ( b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0)
c  in CNF:
c    -b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨  b^{250, 4}_2
c    -b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_1
c    -b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨  b^{250, 4}_0
c  in DIMACS:
-22796 -22797  22798 -750  22799 0
-22796 -22797  22798 -750 -22800 0
-22796 -22797  22798 -750  22801 0

c  -1+1 --> 0
c    ( b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0 ∧  p_750) -> (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧ -b^{250, 4}_0)
c  in CNF:
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_2
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_1
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_0
c  in DIMACS:
-22796  22797 -22798 -750 -22799 0
-22796  22797 -22798 -750 -22800 0
-22796  22797 -22798 -750 -22801 0

c  0+1 --> 1
c    (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧  p_750) -> (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0)
c  in CNF:
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_2
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_1
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨  b^{250, 4}_0
c  in DIMACS:
 22796  22797  22798 -750 -22799 0
 22796  22797  22798 -750 -22800 0
 22796  22797  22798 -750  22801 0

c  1+1 --> 2
c    (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0 ∧  p_750) -> (-b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0)
c  in CNF:
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_2
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨  b^{250, 4}_1
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ -p_750 ∨ -b^{250, 4}_0
c  in DIMACS:
 22796  22797 -22798 -750 -22799 0
 22796  22797 -22798 -750  22800 0
 22796  22797 -22798 -750 -22801 0

c  2+1 --> break 
c    (-b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧  p_750) -> break
c  in CNF:
c     b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 22796 -22797  22798 -750 1162 0


c  2-1 --> 1
c    (-b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧ -p_750) -> (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0)
c  in CNF:
c     b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_2
c     b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_1
c     b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨  b^{250, 4}_0
c  in DIMACS:
 22796 -22797  22798  750 -22799 0
 22796 -22797  22798  750 -22800 0
 22796 -22797  22798  750  22801 0

c  1-1 --> 0
c    (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0 ∧ -p_750) -> (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧ -b^{250, 4}_0)
c  in CNF:
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_2
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_1
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_0
c  in DIMACS:
 22796  22797 -22798  750 -22799 0
 22796  22797 -22798  750 -22800 0
 22796  22797 -22798  750 -22801 0

c  0-1 --> -1
c    (-b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧ -p_750) -> ( b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0)
c  in CNF:
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨  b^{250, 4}_2
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_1
c     b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨  b^{250, 4}_0
c  in DIMACS:
 22796  22797  22798  750  22799 0
 22796  22797  22798  750 -22800 0
 22796  22797  22798  750  22801 0

c  -1-1 --> -2
c    ( b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧  b^{250, 3}_0 ∧ -p_750) -> ( b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0)
c  in CNF:
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨  b^{250, 4}_2
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨  b^{250, 4}_1
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨  p_750 ∨ -b^{250, 4}_0
c  in DIMACS:
-22796  22797 -22798  750  22799 0
-22796  22797 -22798  750  22800 0
-22796  22797 -22798  750 -22801 0

c  -2-1 --> break 
c    ( b^{250, 3}_2 ∧  b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨  b^{250, 3}_0 ∨  p_750 ∨ break
c  in DIMACS:
-22796 -22797  22798  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{250, 3}_2 ∧ -b^{250, 3}_1 ∧ -b^{250, 3}_0 ∧ true) 
c  in CNF:
c    -b^{250, 3}_2 ∨  b^{250, 3}_1 ∨  b^{250, 3}_0 ∨ false 
c  in DIMACS:
-22796  22797  22798  0

c  3 does not represent an automaton state.
c    -(-b^{250, 3}_2 ∧  b^{250, 3}_1 ∧  b^{250, 3}_0 ∧ true) 
c  in CNF:
c     b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ false 
c  in DIMACS:
 22796 -22797 -22798  0
c  -3 does not represent an automaton state.
c    -( b^{250, 3}_2 ∧  b^{250, 3}_1 ∧  b^{250, 3}_0 ∧ true) 
c  in CNF:
c    -b^{250, 3}_2 ∨ -b^{250, 3}_1 ∨ -b^{250, 3}_0 ∨ false 
c  in DIMACS:
-22796 -22797 -22798  0

c i = 4
c  -2+1 --> -1
c    ( b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧  p_1000) -> ( b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧  b^{250, 5}_0)
c  in CNF:
c    -b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨  b^{250, 5}_2
c    -b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_1
c    -b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨  b^{250, 5}_0
c  in DIMACS:
-22799 -22800  22801 -1000  22802 0
-22799 -22800  22801 -1000 -22803 0
-22799 -22800  22801 -1000  22804 0

c  -1+1 --> 0
c    ( b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0 ∧  p_1000) -> (-b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧ -b^{250, 5}_0)
c  in CNF:
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_2
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_1
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_0
c  in DIMACS:
-22799  22800 -22801 -1000 -22802 0
-22799  22800 -22801 -1000 -22803 0
-22799  22800 -22801 -1000 -22804 0

c  0+1 --> 1
c    (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧  p_1000) -> (-b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧  b^{250, 5}_0)
c  in CNF:
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_2
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_1
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨  b^{250, 5}_0
c  in DIMACS:
 22799  22800  22801 -1000 -22802 0
 22799  22800  22801 -1000 -22803 0
 22799  22800  22801 -1000  22804 0

c  1+1 --> 2
c    (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0 ∧  p_1000) -> (-b^{250, 5}_2 ∧  b^{250, 5}_1 ∧ -b^{250, 5}_0)
c  in CNF:
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_2
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨  b^{250, 5}_1
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ -p_1000 ∨ -b^{250, 5}_0
c  in DIMACS:
 22799  22800 -22801 -1000 -22802 0
 22799  22800 -22801 -1000  22803 0
 22799  22800 -22801 -1000 -22804 0

c  2+1 --> break 
c    (-b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧  p_1000) -> break
c  in CNF:
c     b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ -p_1000 ∨ break
c  in DIMACS:
 22799 -22800  22801 -1000 1162 0


c  2-1 --> 1
c    (-b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧ -p_1000) -> (-b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧  b^{250, 5}_0)
c  in CNF:
c     b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_2
c     b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_1
c     b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨  b^{250, 5}_0
c  in DIMACS:
 22799 -22800  22801  1000 -22802 0
 22799 -22800  22801  1000 -22803 0
 22799 -22800  22801  1000  22804 0

c  1-1 --> 0
c    (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0 ∧ -p_1000) -> (-b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧ -b^{250, 5}_0)
c  in CNF:
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_2
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_1
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_0
c  in DIMACS:
 22799  22800 -22801  1000 -22802 0
 22799  22800 -22801  1000 -22803 0
 22799  22800 -22801  1000 -22804 0

c  0-1 --> -1
c    (-b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧ -p_1000) -> ( b^{250, 5}_2 ∧ -b^{250, 5}_1 ∧  b^{250, 5}_0)
c  in CNF:
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨  b^{250, 5}_2
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_1
c     b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨  b^{250, 5}_0
c  in DIMACS:
 22799  22800  22801  1000  22802 0
 22799  22800  22801  1000 -22803 0
 22799  22800  22801  1000  22804 0

c  -1-1 --> -2
c    ( b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧  b^{250, 4}_0 ∧ -p_1000) -> ( b^{250, 5}_2 ∧  b^{250, 5}_1 ∧ -b^{250, 5}_0)
c  in CNF:
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨  b^{250, 5}_2
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨  b^{250, 5}_1
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨  p_1000 ∨ -b^{250, 5}_0
c  in DIMACS:
-22799  22800 -22801  1000  22802 0
-22799  22800 -22801  1000  22803 0
-22799  22800 -22801  1000 -22804 0

c  -2-1 --> break 
c    ( b^{250, 4}_2 ∧  b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧ -p_1000) -> break
c  in CNF:
c    -b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨  b^{250, 4}_0 ∨  p_1000 ∨ break
c  in DIMACS:
-22799 -22800  22801  1000 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{250, 4}_2 ∧ -b^{250, 4}_1 ∧ -b^{250, 4}_0 ∧ true) 
c  in CNF:
c    -b^{250, 4}_2 ∨  b^{250, 4}_1 ∨  b^{250, 4}_0 ∨ false 
c  in DIMACS:
-22799  22800  22801  0

c  3 does not represent an automaton state.
c    -(-b^{250, 4}_2 ∧  b^{250, 4}_1 ∧  b^{250, 4}_0 ∧ true) 
c  in CNF:
c     b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ false 
c  in DIMACS:
 22799 -22800 -22801  0
c  -3 does not represent an automaton state.
c    -( b^{250, 4}_2 ∧  b^{250, 4}_1 ∧  b^{250, 4}_0 ∧ true) 
c  in CNF:
c    -b^{250, 4}_2 ∨ -b^{250, 4}_1 ∨ -b^{250, 4}_0 ∨ false 
c  in DIMACS:
-22799 -22800 -22801  0

c INIT for k = 251
c    -b^{251, 1}_2
c    -b^{251, 1}_1
c    -b^{251, 1}_0
c  in DIMACS:
-22805 0
-22806 0
-22807 0

c Transitions for k = 251
c i = 1
c  -2+1 --> -1
c    ( b^{251, 1}_2 ∧  b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧  p_251) -> ( b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0)
c  in CNF:
c    -b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨  b^{251, 2}_2
c    -b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_1
c    -b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨  b^{251, 2}_0
c  in DIMACS:
-22805 -22806  22807 -251  22808 0
-22805 -22806  22807 -251 -22809 0
-22805 -22806  22807 -251  22810 0

c  -1+1 --> 0
c    ( b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧  b^{251, 1}_0 ∧  p_251) -> (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧ -b^{251, 2}_0)
c  in CNF:
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_2
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_1
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_0
c  in DIMACS:
-22805  22806 -22807 -251 -22808 0
-22805  22806 -22807 -251 -22809 0
-22805  22806 -22807 -251 -22810 0

c  0+1 --> 1
c    (-b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧  p_251) -> (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0)
c  in CNF:
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_2
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_1
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨  b^{251, 2}_0
c  in DIMACS:
 22805  22806  22807 -251 -22808 0
 22805  22806  22807 -251 -22809 0
 22805  22806  22807 -251  22810 0

c  1+1 --> 2
c    (-b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧  b^{251, 1}_0 ∧  p_251) -> (-b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0)
c  in CNF:
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_2
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨  b^{251, 2}_1
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ -p_251 ∨ -b^{251, 2}_0
c  in DIMACS:
 22805  22806 -22807 -251 -22808 0
 22805  22806 -22807 -251  22809 0
 22805  22806 -22807 -251 -22810 0

c  2+1 --> break 
c    (-b^{251, 1}_2 ∧  b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧  p_251) -> break
c  in CNF:
c     b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ -p_251 ∨ break
c  in DIMACS:
 22805 -22806  22807 -251 1162 0


c  2-1 --> 1
c    (-b^{251, 1}_2 ∧  b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧ -p_251) -> (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0)
c  in CNF:
c     b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_2
c     b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_1
c     b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨  b^{251, 2}_0
c  in DIMACS:
 22805 -22806  22807  251 -22808 0
 22805 -22806  22807  251 -22809 0
 22805 -22806  22807  251  22810 0

c  1-1 --> 0
c    (-b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧  b^{251, 1}_0 ∧ -p_251) -> (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧ -b^{251, 2}_0)
c  in CNF:
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_2
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_1
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_0
c  in DIMACS:
 22805  22806 -22807  251 -22808 0
 22805  22806 -22807  251 -22809 0
 22805  22806 -22807  251 -22810 0

c  0-1 --> -1
c    (-b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧ -p_251) -> ( b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0)
c  in CNF:
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨  b^{251, 2}_2
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_1
c     b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨  b^{251, 2}_0
c  in DIMACS:
 22805  22806  22807  251  22808 0
 22805  22806  22807  251 -22809 0
 22805  22806  22807  251  22810 0

c  -1-1 --> -2
c    ( b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧  b^{251, 1}_0 ∧ -p_251) -> ( b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0)
c  in CNF:
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨  b^{251, 2}_2
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨  b^{251, 2}_1
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨  p_251 ∨ -b^{251, 2}_0
c  in DIMACS:
-22805  22806 -22807  251  22808 0
-22805  22806 -22807  251  22809 0
-22805  22806 -22807  251 -22810 0

c  -2-1 --> break 
c    ( b^{251, 1}_2 ∧  b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧ -p_251) -> break
c  in CNF:
c    -b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨  b^{251, 1}_0 ∨  p_251 ∨ break
c  in DIMACS:
-22805 -22806  22807  251 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{251, 1}_2 ∧ -b^{251, 1}_1 ∧ -b^{251, 1}_0 ∧ true) 
c  in CNF:
c    -b^{251, 1}_2 ∨  b^{251, 1}_1 ∨  b^{251, 1}_0 ∨ false 
c  in DIMACS:
-22805  22806  22807  0

c  3 does not represent an automaton state.
c    -(-b^{251, 1}_2 ∧  b^{251, 1}_1 ∧  b^{251, 1}_0 ∧ true) 
c  in CNF:
c     b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ false 
c  in DIMACS:
 22805 -22806 -22807  0
c  -3 does not represent an automaton state.
c    -( b^{251, 1}_2 ∧  b^{251, 1}_1 ∧  b^{251, 1}_0 ∧ true) 
c  in CNF:
c    -b^{251, 1}_2 ∨ -b^{251, 1}_1 ∨ -b^{251, 1}_0 ∨ false 
c  in DIMACS:
-22805 -22806 -22807  0

c i = 2
c  -2+1 --> -1
c    ( b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧  p_502) -> ( b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0)
c  in CNF:
c    -b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨  b^{251, 3}_2
c    -b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_1
c    -b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨  b^{251, 3}_0
c  in DIMACS:
-22808 -22809  22810 -502  22811 0
-22808 -22809  22810 -502 -22812 0
-22808 -22809  22810 -502  22813 0

c  -1+1 --> 0
c    ( b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0 ∧  p_502) -> (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧ -b^{251, 3}_0)
c  in CNF:
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_2
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_1
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_0
c  in DIMACS:
-22808  22809 -22810 -502 -22811 0
-22808  22809 -22810 -502 -22812 0
-22808  22809 -22810 -502 -22813 0

c  0+1 --> 1
c    (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧  p_502) -> (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0)
c  in CNF:
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_2
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_1
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨  b^{251, 3}_0
c  in DIMACS:
 22808  22809  22810 -502 -22811 0
 22808  22809  22810 -502 -22812 0
 22808  22809  22810 -502  22813 0

c  1+1 --> 2
c    (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0 ∧  p_502) -> (-b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0)
c  in CNF:
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_2
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨  b^{251, 3}_1
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ -p_502 ∨ -b^{251, 3}_0
c  in DIMACS:
 22808  22809 -22810 -502 -22811 0
 22808  22809 -22810 -502  22812 0
 22808  22809 -22810 -502 -22813 0

c  2+1 --> break 
c    (-b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧  p_502) -> break
c  in CNF:
c     b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ -p_502 ∨ break
c  in DIMACS:
 22808 -22809  22810 -502 1162 0


c  2-1 --> 1
c    (-b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧ -p_502) -> (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0)
c  in CNF:
c     b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_2
c     b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_1
c     b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨  b^{251, 3}_0
c  in DIMACS:
 22808 -22809  22810  502 -22811 0
 22808 -22809  22810  502 -22812 0
 22808 -22809  22810  502  22813 0

c  1-1 --> 0
c    (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0 ∧ -p_502) -> (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧ -b^{251, 3}_0)
c  in CNF:
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_2
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_1
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_0
c  in DIMACS:
 22808  22809 -22810  502 -22811 0
 22808  22809 -22810  502 -22812 0
 22808  22809 -22810  502 -22813 0

c  0-1 --> -1
c    (-b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧ -p_502) -> ( b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0)
c  in CNF:
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨  b^{251, 3}_2
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_1
c     b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨  b^{251, 3}_0
c  in DIMACS:
 22808  22809  22810  502  22811 0
 22808  22809  22810  502 -22812 0
 22808  22809  22810  502  22813 0

c  -1-1 --> -2
c    ( b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧  b^{251, 2}_0 ∧ -p_502) -> ( b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0)
c  in CNF:
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨  b^{251, 3}_2
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨  b^{251, 3}_1
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨  p_502 ∨ -b^{251, 3}_0
c  in DIMACS:
-22808  22809 -22810  502  22811 0
-22808  22809 -22810  502  22812 0
-22808  22809 -22810  502 -22813 0

c  -2-1 --> break 
c    ( b^{251, 2}_2 ∧  b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧ -p_502) -> break
c  in CNF:
c    -b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨  b^{251, 2}_0 ∨  p_502 ∨ break
c  in DIMACS:
-22808 -22809  22810  502 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{251, 2}_2 ∧ -b^{251, 2}_1 ∧ -b^{251, 2}_0 ∧ true) 
c  in CNF:
c    -b^{251, 2}_2 ∨  b^{251, 2}_1 ∨  b^{251, 2}_0 ∨ false 
c  in DIMACS:
-22808  22809  22810  0

c  3 does not represent an automaton state.
c    -(-b^{251, 2}_2 ∧  b^{251, 2}_1 ∧  b^{251, 2}_0 ∧ true) 
c  in CNF:
c     b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ false 
c  in DIMACS:
 22808 -22809 -22810  0
c  -3 does not represent an automaton state.
c    -( b^{251, 2}_2 ∧  b^{251, 2}_1 ∧  b^{251, 2}_0 ∧ true) 
c  in CNF:
c    -b^{251, 2}_2 ∨ -b^{251, 2}_1 ∨ -b^{251, 2}_0 ∨ false 
c  in DIMACS:
-22808 -22809 -22810  0

c i = 3
c  -2+1 --> -1
c    ( b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧  p_753) -> ( b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0)
c  in CNF:
c    -b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨  b^{251, 4}_2
c    -b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_1
c    -b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨  b^{251, 4}_0
c  in DIMACS:
-22811 -22812  22813 -753  22814 0
-22811 -22812  22813 -753 -22815 0
-22811 -22812  22813 -753  22816 0

c  -1+1 --> 0
c    ( b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0 ∧  p_753) -> (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧ -b^{251, 4}_0)
c  in CNF:
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_2
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_1
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_0
c  in DIMACS:
-22811  22812 -22813 -753 -22814 0
-22811  22812 -22813 -753 -22815 0
-22811  22812 -22813 -753 -22816 0

c  0+1 --> 1
c    (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧  p_753) -> (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0)
c  in CNF:
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_2
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_1
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨  b^{251, 4}_0
c  in DIMACS:
 22811  22812  22813 -753 -22814 0
 22811  22812  22813 -753 -22815 0
 22811  22812  22813 -753  22816 0

c  1+1 --> 2
c    (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0 ∧  p_753) -> (-b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0)
c  in CNF:
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_2
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨  b^{251, 4}_1
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ -p_753 ∨ -b^{251, 4}_0
c  in DIMACS:
 22811  22812 -22813 -753 -22814 0
 22811  22812 -22813 -753  22815 0
 22811  22812 -22813 -753 -22816 0

c  2+1 --> break 
c    (-b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧  p_753) -> break
c  in CNF:
c     b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ -p_753 ∨ break
c  in DIMACS:
 22811 -22812  22813 -753 1162 0


c  2-1 --> 1
c    (-b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧ -p_753) -> (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0)
c  in CNF:
c     b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_2
c     b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_1
c     b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨  b^{251, 4}_0
c  in DIMACS:
 22811 -22812  22813  753 -22814 0
 22811 -22812  22813  753 -22815 0
 22811 -22812  22813  753  22816 0

c  1-1 --> 0
c    (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0 ∧ -p_753) -> (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧ -b^{251, 4}_0)
c  in CNF:
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_2
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_1
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_0
c  in DIMACS:
 22811  22812 -22813  753 -22814 0
 22811  22812 -22813  753 -22815 0
 22811  22812 -22813  753 -22816 0

c  0-1 --> -1
c    (-b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧ -p_753) -> ( b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0)
c  in CNF:
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨  b^{251, 4}_2
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_1
c     b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨  b^{251, 4}_0
c  in DIMACS:
 22811  22812  22813  753  22814 0
 22811  22812  22813  753 -22815 0
 22811  22812  22813  753  22816 0

c  -1-1 --> -2
c    ( b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧  b^{251, 3}_0 ∧ -p_753) -> ( b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0)
c  in CNF:
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨  b^{251, 4}_2
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨  b^{251, 4}_1
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨  p_753 ∨ -b^{251, 4}_0
c  in DIMACS:
-22811  22812 -22813  753  22814 0
-22811  22812 -22813  753  22815 0
-22811  22812 -22813  753 -22816 0

c  -2-1 --> break 
c    ( b^{251, 3}_2 ∧  b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧ -p_753) -> break
c  in CNF:
c    -b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨  b^{251, 3}_0 ∨  p_753 ∨ break
c  in DIMACS:
-22811 -22812  22813  753 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{251, 3}_2 ∧ -b^{251, 3}_1 ∧ -b^{251, 3}_0 ∧ true) 
c  in CNF:
c    -b^{251, 3}_2 ∨  b^{251, 3}_1 ∨  b^{251, 3}_0 ∨ false 
c  in DIMACS:
-22811  22812  22813  0

c  3 does not represent an automaton state.
c    -(-b^{251, 3}_2 ∧  b^{251, 3}_1 ∧  b^{251, 3}_0 ∧ true) 
c  in CNF:
c     b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ false 
c  in DIMACS:
 22811 -22812 -22813  0
c  -3 does not represent an automaton state.
c    -( b^{251, 3}_2 ∧  b^{251, 3}_1 ∧  b^{251, 3}_0 ∧ true) 
c  in CNF:
c    -b^{251, 3}_2 ∨ -b^{251, 3}_1 ∨ -b^{251, 3}_0 ∨ false 
c  in DIMACS:
-22811 -22812 -22813  0

c i = 4
c  -2+1 --> -1
c    ( b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧  p_1004) -> ( b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧  b^{251, 5}_0)
c  in CNF:
c    -b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨  b^{251, 5}_2
c    -b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_1
c    -b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨  b^{251, 5}_0
c  in DIMACS:
-22814 -22815  22816 -1004  22817 0
-22814 -22815  22816 -1004 -22818 0
-22814 -22815  22816 -1004  22819 0

c  -1+1 --> 0
c    ( b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0 ∧  p_1004) -> (-b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧ -b^{251, 5}_0)
c  in CNF:
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_2
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_1
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_0
c  in DIMACS:
-22814  22815 -22816 -1004 -22817 0
-22814  22815 -22816 -1004 -22818 0
-22814  22815 -22816 -1004 -22819 0

c  0+1 --> 1
c    (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧  p_1004) -> (-b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧  b^{251, 5}_0)
c  in CNF:
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_2
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_1
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨  b^{251, 5}_0
c  in DIMACS:
 22814  22815  22816 -1004 -22817 0
 22814  22815  22816 -1004 -22818 0
 22814  22815  22816 -1004  22819 0

c  1+1 --> 2
c    (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0 ∧  p_1004) -> (-b^{251, 5}_2 ∧  b^{251, 5}_1 ∧ -b^{251, 5}_0)
c  in CNF:
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_2
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨  b^{251, 5}_1
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ -p_1004 ∨ -b^{251, 5}_0
c  in DIMACS:
 22814  22815 -22816 -1004 -22817 0
 22814  22815 -22816 -1004  22818 0
 22814  22815 -22816 -1004 -22819 0

c  2+1 --> break 
c    (-b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧  p_1004) -> break
c  in CNF:
c     b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ -p_1004 ∨ break
c  in DIMACS:
 22814 -22815  22816 -1004 1162 0


c  2-1 --> 1
c    (-b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧ -p_1004) -> (-b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧  b^{251, 5}_0)
c  in CNF:
c     b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_2
c     b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_1
c     b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨  b^{251, 5}_0
c  in DIMACS:
 22814 -22815  22816  1004 -22817 0
 22814 -22815  22816  1004 -22818 0
 22814 -22815  22816  1004  22819 0

c  1-1 --> 0
c    (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0 ∧ -p_1004) -> (-b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧ -b^{251, 5}_0)
c  in CNF:
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_2
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_1
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_0
c  in DIMACS:
 22814  22815 -22816  1004 -22817 0
 22814  22815 -22816  1004 -22818 0
 22814  22815 -22816  1004 -22819 0

c  0-1 --> -1
c    (-b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧ -p_1004) -> ( b^{251, 5}_2 ∧ -b^{251, 5}_1 ∧  b^{251, 5}_0)
c  in CNF:
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨  b^{251, 5}_2
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_1
c     b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨  b^{251, 5}_0
c  in DIMACS:
 22814  22815  22816  1004  22817 0
 22814  22815  22816  1004 -22818 0
 22814  22815  22816  1004  22819 0

c  -1-1 --> -2
c    ( b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧  b^{251, 4}_0 ∧ -p_1004) -> ( b^{251, 5}_2 ∧  b^{251, 5}_1 ∧ -b^{251, 5}_0)
c  in CNF:
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨  b^{251, 5}_2
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨  b^{251, 5}_1
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨  p_1004 ∨ -b^{251, 5}_0
c  in DIMACS:
-22814  22815 -22816  1004  22817 0
-22814  22815 -22816  1004  22818 0
-22814  22815 -22816  1004 -22819 0

c  -2-1 --> break 
c    ( b^{251, 4}_2 ∧  b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧ -p_1004) -> break
c  in CNF:
c    -b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨  b^{251, 4}_0 ∨  p_1004 ∨ break
c  in DIMACS:
-22814 -22815  22816  1004 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{251, 4}_2 ∧ -b^{251, 4}_1 ∧ -b^{251, 4}_0 ∧ true) 
c  in CNF:
c    -b^{251, 4}_2 ∨  b^{251, 4}_1 ∨  b^{251, 4}_0 ∨ false 
c  in DIMACS:
-22814  22815  22816  0

c  3 does not represent an automaton state.
c    -(-b^{251, 4}_2 ∧  b^{251, 4}_1 ∧  b^{251, 4}_0 ∧ true) 
c  in CNF:
c     b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ false 
c  in DIMACS:
 22814 -22815 -22816  0
c  -3 does not represent an automaton state.
c    -( b^{251, 4}_2 ∧  b^{251, 4}_1 ∧  b^{251, 4}_0 ∧ true) 
c  in CNF:
c    -b^{251, 4}_2 ∨ -b^{251, 4}_1 ∨ -b^{251, 4}_0 ∨ false 
c  in DIMACS:
-22814 -22815 -22816  0

c INIT for k = 252
c    -b^{252, 1}_2
c    -b^{252, 1}_1
c    -b^{252, 1}_0
c  in DIMACS:
-22820 0
-22821 0
-22822 0

c Transitions for k = 252
c i = 1
c  -2+1 --> -1
c    ( b^{252, 1}_2 ∧  b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧  p_252) -> ( b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0)
c  in CNF:
c    -b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨  b^{252, 2}_2
c    -b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_1
c    -b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨  b^{252, 2}_0
c  in DIMACS:
-22820 -22821  22822 -252  22823 0
-22820 -22821  22822 -252 -22824 0
-22820 -22821  22822 -252  22825 0

c  -1+1 --> 0
c    ( b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧  b^{252, 1}_0 ∧  p_252) -> (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧ -b^{252, 2}_0)
c  in CNF:
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_2
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_1
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_0
c  in DIMACS:
-22820  22821 -22822 -252 -22823 0
-22820  22821 -22822 -252 -22824 0
-22820  22821 -22822 -252 -22825 0

c  0+1 --> 1
c    (-b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧  p_252) -> (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0)
c  in CNF:
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_2
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_1
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨  b^{252, 2}_0
c  in DIMACS:
 22820  22821  22822 -252 -22823 0
 22820  22821  22822 -252 -22824 0
 22820  22821  22822 -252  22825 0

c  1+1 --> 2
c    (-b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧  b^{252, 1}_0 ∧  p_252) -> (-b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0)
c  in CNF:
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_2
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨  b^{252, 2}_1
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ -p_252 ∨ -b^{252, 2}_0
c  in DIMACS:
 22820  22821 -22822 -252 -22823 0
 22820  22821 -22822 -252  22824 0
 22820  22821 -22822 -252 -22825 0

c  2+1 --> break 
c    (-b^{252, 1}_2 ∧  b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧  p_252) -> break
c  in CNF:
c     b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ -p_252 ∨ break
c  in DIMACS:
 22820 -22821  22822 -252 1162 0


c  2-1 --> 1
c    (-b^{252, 1}_2 ∧  b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧ -p_252) -> (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0)
c  in CNF:
c     b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_2
c     b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_1
c     b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨  b^{252, 2}_0
c  in DIMACS:
 22820 -22821  22822  252 -22823 0
 22820 -22821  22822  252 -22824 0
 22820 -22821  22822  252  22825 0

c  1-1 --> 0
c    (-b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧  b^{252, 1}_0 ∧ -p_252) -> (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧ -b^{252, 2}_0)
c  in CNF:
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_2
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_1
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_0
c  in DIMACS:
 22820  22821 -22822  252 -22823 0
 22820  22821 -22822  252 -22824 0
 22820  22821 -22822  252 -22825 0

c  0-1 --> -1
c    (-b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧ -p_252) -> ( b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0)
c  in CNF:
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨  b^{252, 2}_2
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_1
c     b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨  b^{252, 2}_0
c  in DIMACS:
 22820  22821  22822  252  22823 0
 22820  22821  22822  252 -22824 0
 22820  22821  22822  252  22825 0

c  -1-1 --> -2
c    ( b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧  b^{252, 1}_0 ∧ -p_252) -> ( b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0)
c  in CNF:
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨  b^{252, 2}_2
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨  b^{252, 2}_1
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨  p_252 ∨ -b^{252, 2}_0
c  in DIMACS:
-22820  22821 -22822  252  22823 0
-22820  22821 -22822  252  22824 0
-22820  22821 -22822  252 -22825 0

c  -2-1 --> break 
c    ( b^{252, 1}_2 ∧  b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧ -p_252) -> break
c  in CNF:
c    -b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨  b^{252, 1}_0 ∨  p_252 ∨ break
c  in DIMACS:
-22820 -22821  22822  252 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{252, 1}_2 ∧ -b^{252, 1}_1 ∧ -b^{252, 1}_0 ∧ true) 
c  in CNF:
c    -b^{252, 1}_2 ∨  b^{252, 1}_1 ∨  b^{252, 1}_0 ∨ false 
c  in DIMACS:
-22820  22821  22822  0

c  3 does not represent an automaton state.
c    -(-b^{252, 1}_2 ∧  b^{252, 1}_1 ∧  b^{252, 1}_0 ∧ true) 
c  in CNF:
c     b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ false 
c  in DIMACS:
 22820 -22821 -22822  0
c  -3 does not represent an automaton state.
c    -( b^{252, 1}_2 ∧  b^{252, 1}_1 ∧  b^{252, 1}_0 ∧ true) 
c  in CNF:
c    -b^{252, 1}_2 ∨ -b^{252, 1}_1 ∨ -b^{252, 1}_0 ∨ false 
c  in DIMACS:
-22820 -22821 -22822  0

c i = 2
c  -2+1 --> -1
c    ( b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧  p_504) -> ( b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0)
c  in CNF:
c    -b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨  b^{252, 3}_2
c    -b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_1
c    -b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨  b^{252, 3}_0
c  in DIMACS:
-22823 -22824  22825 -504  22826 0
-22823 -22824  22825 -504 -22827 0
-22823 -22824  22825 -504  22828 0

c  -1+1 --> 0
c    ( b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0 ∧  p_504) -> (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧ -b^{252, 3}_0)
c  in CNF:
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_2
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_1
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_0
c  in DIMACS:
-22823  22824 -22825 -504 -22826 0
-22823  22824 -22825 -504 -22827 0
-22823  22824 -22825 -504 -22828 0

c  0+1 --> 1
c    (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧  p_504) -> (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0)
c  in CNF:
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_2
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_1
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨  b^{252, 3}_0
c  in DIMACS:
 22823  22824  22825 -504 -22826 0
 22823  22824  22825 -504 -22827 0
 22823  22824  22825 -504  22828 0

c  1+1 --> 2
c    (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0 ∧  p_504) -> (-b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0)
c  in CNF:
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_2
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨  b^{252, 3}_1
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ -p_504 ∨ -b^{252, 3}_0
c  in DIMACS:
 22823  22824 -22825 -504 -22826 0
 22823  22824 -22825 -504  22827 0
 22823  22824 -22825 -504 -22828 0

c  2+1 --> break 
c    (-b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧  p_504) -> break
c  in CNF:
c     b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ -p_504 ∨ break
c  in DIMACS:
 22823 -22824  22825 -504 1162 0


c  2-1 --> 1
c    (-b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧ -p_504) -> (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0)
c  in CNF:
c     b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_2
c     b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_1
c     b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨  b^{252, 3}_0
c  in DIMACS:
 22823 -22824  22825  504 -22826 0
 22823 -22824  22825  504 -22827 0
 22823 -22824  22825  504  22828 0

c  1-1 --> 0
c    (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0 ∧ -p_504) -> (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧ -b^{252, 3}_0)
c  in CNF:
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_2
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_1
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_0
c  in DIMACS:
 22823  22824 -22825  504 -22826 0
 22823  22824 -22825  504 -22827 0
 22823  22824 -22825  504 -22828 0

c  0-1 --> -1
c    (-b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧ -p_504) -> ( b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0)
c  in CNF:
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨  b^{252, 3}_2
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_1
c     b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨  b^{252, 3}_0
c  in DIMACS:
 22823  22824  22825  504  22826 0
 22823  22824  22825  504 -22827 0
 22823  22824  22825  504  22828 0

c  -1-1 --> -2
c    ( b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧  b^{252, 2}_0 ∧ -p_504) -> ( b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0)
c  in CNF:
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨  b^{252, 3}_2
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨  b^{252, 3}_1
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨  p_504 ∨ -b^{252, 3}_0
c  in DIMACS:
-22823  22824 -22825  504  22826 0
-22823  22824 -22825  504  22827 0
-22823  22824 -22825  504 -22828 0

c  -2-1 --> break 
c    ( b^{252, 2}_2 ∧  b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧ -p_504) -> break
c  in CNF:
c    -b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨  b^{252, 2}_0 ∨  p_504 ∨ break
c  in DIMACS:
-22823 -22824  22825  504 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{252, 2}_2 ∧ -b^{252, 2}_1 ∧ -b^{252, 2}_0 ∧ true) 
c  in CNF:
c    -b^{252, 2}_2 ∨  b^{252, 2}_1 ∨  b^{252, 2}_0 ∨ false 
c  in DIMACS:
-22823  22824  22825  0

c  3 does not represent an automaton state.
c    -(-b^{252, 2}_2 ∧  b^{252, 2}_1 ∧  b^{252, 2}_0 ∧ true) 
c  in CNF:
c     b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ false 
c  in DIMACS:
 22823 -22824 -22825  0
c  -3 does not represent an automaton state.
c    -( b^{252, 2}_2 ∧  b^{252, 2}_1 ∧  b^{252, 2}_0 ∧ true) 
c  in CNF:
c    -b^{252, 2}_2 ∨ -b^{252, 2}_1 ∨ -b^{252, 2}_0 ∨ false 
c  in DIMACS:
-22823 -22824 -22825  0

c i = 3
c  -2+1 --> -1
c    ( b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧  p_756) -> ( b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0)
c  in CNF:
c    -b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨  b^{252, 4}_2
c    -b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_1
c    -b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨  b^{252, 4}_0
c  in DIMACS:
-22826 -22827  22828 -756  22829 0
-22826 -22827  22828 -756 -22830 0
-22826 -22827  22828 -756  22831 0

c  -1+1 --> 0
c    ( b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0 ∧  p_756) -> (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧ -b^{252, 4}_0)
c  in CNF:
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_2
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_1
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_0
c  in DIMACS:
-22826  22827 -22828 -756 -22829 0
-22826  22827 -22828 -756 -22830 0
-22826  22827 -22828 -756 -22831 0

c  0+1 --> 1
c    (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧  p_756) -> (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0)
c  in CNF:
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_2
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_1
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨  b^{252, 4}_0
c  in DIMACS:
 22826  22827  22828 -756 -22829 0
 22826  22827  22828 -756 -22830 0
 22826  22827  22828 -756  22831 0

c  1+1 --> 2
c    (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0 ∧  p_756) -> (-b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0)
c  in CNF:
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_2
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨  b^{252, 4}_1
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ -p_756 ∨ -b^{252, 4}_0
c  in DIMACS:
 22826  22827 -22828 -756 -22829 0
 22826  22827 -22828 -756  22830 0
 22826  22827 -22828 -756 -22831 0

c  2+1 --> break 
c    (-b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧  p_756) -> break
c  in CNF:
c     b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 22826 -22827  22828 -756 1162 0


c  2-1 --> 1
c    (-b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧ -p_756) -> (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0)
c  in CNF:
c     b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_2
c     b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_1
c     b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨  b^{252, 4}_0
c  in DIMACS:
 22826 -22827  22828  756 -22829 0
 22826 -22827  22828  756 -22830 0
 22826 -22827  22828  756  22831 0

c  1-1 --> 0
c    (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0 ∧ -p_756) -> (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧ -b^{252, 4}_0)
c  in CNF:
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_2
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_1
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_0
c  in DIMACS:
 22826  22827 -22828  756 -22829 0
 22826  22827 -22828  756 -22830 0
 22826  22827 -22828  756 -22831 0

c  0-1 --> -1
c    (-b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧ -p_756) -> ( b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0)
c  in CNF:
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨  b^{252, 4}_2
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_1
c     b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨  b^{252, 4}_0
c  in DIMACS:
 22826  22827  22828  756  22829 0
 22826  22827  22828  756 -22830 0
 22826  22827  22828  756  22831 0

c  -1-1 --> -2
c    ( b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧  b^{252, 3}_0 ∧ -p_756) -> ( b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0)
c  in CNF:
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨  b^{252, 4}_2
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨  b^{252, 4}_1
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨  p_756 ∨ -b^{252, 4}_0
c  in DIMACS:
-22826  22827 -22828  756  22829 0
-22826  22827 -22828  756  22830 0
-22826  22827 -22828  756 -22831 0

c  -2-1 --> break 
c    ( b^{252, 3}_2 ∧  b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨  b^{252, 3}_0 ∨  p_756 ∨ break
c  in DIMACS:
-22826 -22827  22828  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{252, 3}_2 ∧ -b^{252, 3}_1 ∧ -b^{252, 3}_0 ∧ true) 
c  in CNF:
c    -b^{252, 3}_2 ∨  b^{252, 3}_1 ∨  b^{252, 3}_0 ∨ false 
c  in DIMACS:
-22826  22827  22828  0

c  3 does not represent an automaton state.
c    -(-b^{252, 3}_2 ∧  b^{252, 3}_1 ∧  b^{252, 3}_0 ∧ true) 
c  in CNF:
c     b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ false 
c  in DIMACS:
 22826 -22827 -22828  0
c  -3 does not represent an automaton state.
c    -( b^{252, 3}_2 ∧  b^{252, 3}_1 ∧  b^{252, 3}_0 ∧ true) 
c  in CNF:
c    -b^{252, 3}_2 ∨ -b^{252, 3}_1 ∨ -b^{252, 3}_0 ∨ false 
c  in DIMACS:
-22826 -22827 -22828  0

c i = 4
c  -2+1 --> -1
c    ( b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧  p_1008) -> ( b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧  b^{252, 5}_0)
c  in CNF:
c    -b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨  b^{252, 5}_2
c    -b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_1
c    -b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨  b^{252, 5}_0
c  in DIMACS:
-22829 -22830  22831 -1008  22832 0
-22829 -22830  22831 -1008 -22833 0
-22829 -22830  22831 -1008  22834 0

c  -1+1 --> 0
c    ( b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0 ∧  p_1008) -> (-b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧ -b^{252, 5}_0)
c  in CNF:
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_2
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_1
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_0
c  in DIMACS:
-22829  22830 -22831 -1008 -22832 0
-22829  22830 -22831 -1008 -22833 0
-22829  22830 -22831 -1008 -22834 0

c  0+1 --> 1
c    (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧  p_1008) -> (-b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧  b^{252, 5}_0)
c  in CNF:
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_2
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_1
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨  b^{252, 5}_0
c  in DIMACS:
 22829  22830  22831 -1008 -22832 0
 22829  22830  22831 -1008 -22833 0
 22829  22830  22831 -1008  22834 0

c  1+1 --> 2
c    (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0 ∧  p_1008) -> (-b^{252, 5}_2 ∧  b^{252, 5}_1 ∧ -b^{252, 5}_0)
c  in CNF:
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_2
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨  b^{252, 5}_1
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ -p_1008 ∨ -b^{252, 5}_0
c  in DIMACS:
 22829  22830 -22831 -1008 -22832 0
 22829  22830 -22831 -1008  22833 0
 22829  22830 -22831 -1008 -22834 0

c  2+1 --> break 
c    (-b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 22829 -22830  22831 -1008 1162 0


c  2-1 --> 1
c    (-b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧ -p_1008) -> (-b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧  b^{252, 5}_0)
c  in CNF:
c     b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_2
c     b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_1
c     b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨  b^{252, 5}_0
c  in DIMACS:
 22829 -22830  22831  1008 -22832 0
 22829 -22830  22831  1008 -22833 0
 22829 -22830  22831  1008  22834 0

c  1-1 --> 0
c    (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0 ∧ -p_1008) -> (-b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧ -b^{252, 5}_0)
c  in CNF:
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_2
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_1
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_0
c  in DIMACS:
 22829  22830 -22831  1008 -22832 0
 22829  22830 -22831  1008 -22833 0
 22829  22830 -22831  1008 -22834 0

c  0-1 --> -1
c    (-b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧ -p_1008) -> ( b^{252, 5}_2 ∧ -b^{252, 5}_1 ∧  b^{252, 5}_0)
c  in CNF:
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨  b^{252, 5}_2
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_1
c     b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨  b^{252, 5}_0
c  in DIMACS:
 22829  22830  22831  1008  22832 0
 22829  22830  22831  1008 -22833 0
 22829  22830  22831  1008  22834 0

c  -1-1 --> -2
c    ( b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧  b^{252, 4}_0 ∧ -p_1008) -> ( b^{252, 5}_2 ∧  b^{252, 5}_1 ∧ -b^{252, 5}_0)
c  in CNF:
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨  b^{252, 5}_2
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨  b^{252, 5}_1
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨  p_1008 ∨ -b^{252, 5}_0
c  in DIMACS:
-22829  22830 -22831  1008  22832 0
-22829  22830 -22831  1008  22833 0
-22829  22830 -22831  1008 -22834 0

c  -2-1 --> break 
c    ( b^{252, 4}_2 ∧  b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨  b^{252, 4}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-22829 -22830  22831  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{252, 4}_2 ∧ -b^{252, 4}_1 ∧ -b^{252, 4}_0 ∧ true) 
c  in CNF:
c    -b^{252, 4}_2 ∨  b^{252, 4}_1 ∨  b^{252, 4}_0 ∨ false 
c  in DIMACS:
-22829  22830  22831  0

c  3 does not represent an automaton state.
c    -(-b^{252, 4}_2 ∧  b^{252, 4}_1 ∧  b^{252, 4}_0 ∧ true) 
c  in CNF:
c     b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ false 
c  in DIMACS:
 22829 -22830 -22831  0
c  -3 does not represent an automaton state.
c    -( b^{252, 4}_2 ∧  b^{252, 4}_1 ∧  b^{252, 4}_0 ∧ true) 
c  in CNF:
c    -b^{252, 4}_2 ∨ -b^{252, 4}_1 ∨ -b^{252, 4}_0 ∨ false 
c  in DIMACS:
-22829 -22830 -22831  0

c INIT for k = 253
c    -b^{253, 1}_2
c    -b^{253, 1}_1
c    -b^{253, 1}_0
c  in DIMACS:
-22835 0
-22836 0
-22837 0

c Transitions for k = 253
c i = 1
c  -2+1 --> -1
c    ( b^{253, 1}_2 ∧  b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧  p_253) -> ( b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0)
c  in CNF:
c    -b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨  b^{253, 2}_2
c    -b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_1
c    -b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨  b^{253, 2}_0
c  in DIMACS:
-22835 -22836  22837 -253  22838 0
-22835 -22836  22837 -253 -22839 0
-22835 -22836  22837 -253  22840 0

c  -1+1 --> 0
c    ( b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧  b^{253, 1}_0 ∧  p_253) -> (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧ -b^{253, 2}_0)
c  in CNF:
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_2
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_1
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_0
c  in DIMACS:
-22835  22836 -22837 -253 -22838 0
-22835  22836 -22837 -253 -22839 0
-22835  22836 -22837 -253 -22840 0

c  0+1 --> 1
c    (-b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧  p_253) -> (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0)
c  in CNF:
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_2
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_1
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨  b^{253, 2}_0
c  in DIMACS:
 22835  22836  22837 -253 -22838 0
 22835  22836  22837 -253 -22839 0
 22835  22836  22837 -253  22840 0

c  1+1 --> 2
c    (-b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧  b^{253, 1}_0 ∧  p_253) -> (-b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0)
c  in CNF:
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_2
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨  b^{253, 2}_1
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ -p_253 ∨ -b^{253, 2}_0
c  in DIMACS:
 22835  22836 -22837 -253 -22838 0
 22835  22836 -22837 -253  22839 0
 22835  22836 -22837 -253 -22840 0

c  2+1 --> break 
c    (-b^{253, 1}_2 ∧  b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧  p_253) -> break
c  in CNF:
c     b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ -p_253 ∨ break
c  in DIMACS:
 22835 -22836  22837 -253 1162 0


c  2-1 --> 1
c    (-b^{253, 1}_2 ∧  b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧ -p_253) -> (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0)
c  in CNF:
c     b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_2
c     b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_1
c     b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨  b^{253, 2}_0
c  in DIMACS:
 22835 -22836  22837  253 -22838 0
 22835 -22836  22837  253 -22839 0
 22835 -22836  22837  253  22840 0

c  1-1 --> 0
c    (-b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧  b^{253, 1}_0 ∧ -p_253) -> (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧ -b^{253, 2}_0)
c  in CNF:
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_2
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_1
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_0
c  in DIMACS:
 22835  22836 -22837  253 -22838 0
 22835  22836 -22837  253 -22839 0
 22835  22836 -22837  253 -22840 0

c  0-1 --> -1
c    (-b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧ -p_253) -> ( b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0)
c  in CNF:
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨  b^{253, 2}_2
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_1
c     b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨  b^{253, 2}_0
c  in DIMACS:
 22835  22836  22837  253  22838 0
 22835  22836  22837  253 -22839 0
 22835  22836  22837  253  22840 0

c  -1-1 --> -2
c    ( b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧  b^{253, 1}_0 ∧ -p_253) -> ( b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0)
c  in CNF:
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨  b^{253, 2}_2
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨  b^{253, 2}_1
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨  p_253 ∨ -b^{253, 2}_0
c  in DIMACS:
-22835  22836 -22837  253  22838 0
-22835  22836 -22837  253  22839 0
-22835  22836 -22837  253 -22840 0

c  -2-1 --> break 
c    ( b^{253, 1}_2 ∧  b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧ -p_253) -> break
c  in CNF:
c    -b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨  b^{253, 1}_0 ∨  p_253 ∨ break
c  in DIMACS:
-22835 -22836  22837  253 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{253, 1}_2 ∧ -b^{253, 1}_1 ∧ -b^{253, 1}_0 ∧ true) 
c  in CNF:
c    -b^{253, 1}_2 ∨  b^{253, 1}_1 ∨  b^{253, 1}_0 ∨ false 
c  in DIMACS:
-22835  22836  22837  0

c  3 does not represent an automaton state.
c    -(-b^{253, 1}_2 ∧  b^{253, 1}_1 ∧  b^{253, 1}_0 ∧ true) 
c  in CNF:
c     b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ false 
c  in DIMACS:
 22835 -22836 -22837  0
c  -3 does not represent an automaton state.
c    -( b^{253, 1}_2 ∧  b^{253, 1}_1 ∧  b^{253, 1}_0 ∧ true) 
c  in CNF:
c    -b^{253, 1}_2 ∨ -b^{253, 1}_1 ∨ -b^{253, 1}_0 ∨ false 
c  in DIMACS:
-22835 -22836 -22837  0

c i = 2
c  -2+1 --> -1
c    ( b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧  p_506) -> ( b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0)
c  in CNF:
c    -b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨  b^{253, 3}_2
c    -b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_1
c    -b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨  b^{253, 3}_0
c  in DIMACS:
-22838 -22839  22840 -506  22841 0
-22838 -22839  22840 -506 -22842 0
-22838 -22839  22840 -506  22843 0

c  -1+1 --> 0
c    ( b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0 ∧  p_506) -> (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧ -b^{253, 3}_0)
c  in CNF:
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_2
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_1
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_0
c  in DIMACS:
-22838  22839 -22840 -506 -22841 0
-22838  22839 -22840 -506 -22842 0
-22838  22839 -22840 -506 -22843 0

c  0+1 --> 1
c    (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧  p_506) -> (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0)
c  in CNF:
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_2
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_1
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨  b^{253, 3}_0
c  in DIMACS:
 22838  22839  22840 -506 -22841 0
 22838  22839  22840 -506 -22842 0
 22838  22839  22840 -506  22843 0

c  1+1 --> 2
c    (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0 ∧  p_506) -> (-b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0)
c  in CNF:
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_2
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨  b^{253, 3}_1
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ -p_506 ∨ -b^{253, 3}_0
c  in DIMACS:
 22838  22839 -22840 -506 -22841 0
 22838  22839 -22840 -506  22842 0
 22838  22839 -22840 -506 -22843 0

c  2+1 --> break 
c    (-b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧  p_506) -> break
c  in CNF:
c     b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ -p_506 ∨ break
c  in DIMACS:
 22838 -22839  22840 -506 1162 0


c  2-1 --> 1
c    (-b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧ -p_506) -> (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0)
c  in CNF:
c     b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_2
c     b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_1
c     b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨  b^{253, 3}_0
c  in DIMACS:
 22838 -22839  22840  506 -22841 0
 22838 -22839  22840  506 -22842 0
 22838 -22839  22840  506  22843 0

c  1-1 --> 0
c    (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0 ∧ -p_506) -> (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧ -b^{253, 3}_0)
c  in CNF:
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_2
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_1
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_0
c  in DIMACS:
 22838  22839 -22840  506 -22841 0
 22838  22839 -22840  506 -22842 0
 22838  22839 -22840  506 -22843 0

c  0-1 --> -1
c    (-b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧ -p_506) -> ( b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0)
c  in CNF:
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨  b^{253, 3}_2
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_1
c     b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨  b^{253, 3}_0
c  in DIMACS:
 22838  22839  22840  506  22841 0
 22838  22839  22840  506 -22842 0
 22838  22839  22840  506  22843 0

c  -1-1 --> -2
c    ( b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧  b^{253, 2}_0 ∧ -p_506) -> ( b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0)
c  in CNF:
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨  b^{253, 3}_2
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨  b^{253, 3}_1
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨  p_506 ∨ -b^{253, 3}_0
c  in DIMACS:
-22838  22839 -22840  506  22841 0
-22838  22839 -22840  506  22842 0
-22838  22839 -22840  506 -22843 0

c  -2-1 --> break 
c    ( b^{253, 2}_2 ∧  b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧ -p_506) -> break
c  in CNF:
c    -b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨  b^{253, 2}_0 ∨  p_506 ∨ break
c  in DIMACS:
-22838 -22839  22840  506 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{253, 2}_2 ∧ -b^{253, 2}_1 ∧ -b^{253, 2}_0 ∧ true) 
c  in CNF:
c    -b^{253, 2}_2 ∨  b^{253, 2}_1 ∨  b^{253, 2}_0 ∨ false 
c  in DIMACS:
-22838  22839  22840  0

c  3 does not represent an automaton state.
c    -(-b^{253, 2}_2 ∧  b^{253, 2}_1 ∧  b^{253, 2}_0 ∧ true) 
c  in CNF:
c     b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ false 
c  in DIMACS:
 22838 -22839 -22840  0
c  -3 does not represent an automaton state.
c    -( b^{253, 2}_2 ∧  b^{253, 2}_1 ∧  b^{253, 2}_0 ∧ true) 
c  in CNF:
c    -b^{253, 2}_2 ∨ -b^{253, 2}_1 ∨ -b^{253, 2}_0 ∨ false 
c  in DIMACS:
-22838 -22839 -22840  0

c i = 3
c  -2+1 --> -1
c    ( b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧  p_759) -> ( b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0)
c  in CNF:
c    -b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨  b^{253, 4}_2
c    -b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_1
c    -b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨  b^{253, 4}_0
c  in DIMACS:
-22841 -22842  22843 -759  22844 0
-22841 -22842  22843 -759 -22845 0
-22841 -22842  22843 -759  22846 0

c  -1+1 --> 0
c    ( b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0 ∧  p_759) -> (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧ -b^{253, 4}_0)
c  in CNF:
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_2
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_1
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_0
c  in DIMACS:
-22841  22842 -22843 -759 -22844 0
-22841  22842 -22843 -759 -22845 0
-22841  22842 -22843 -759 -22846 0

c  0+1 --> 1
c    (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧  p_759) -> (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0)
c  in CNF:
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_2
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_1
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨  b^{253, 4}_0
c  in DIMACS:
 22841  22842  22843 -759 -22844 0
 22841  22842  22843 -759 -22845 0
 22841  22842  22843 -759  22846 0

c  1+1 --> 2
c    (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0 ∧  p_759) -> (-b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0)
c  in CNF:
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_2
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨  b^{253, 4}_1
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ -p_759 ∨ -b^{253, 4}_0
c  in DIMACS:
 22841  22842 -22843 -759 -22844 0
 22841  22842 -22843 -759  22845 0
 22841  22842 -22843 -759 -22846 0

c  2+1 --> break 
c    (-b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧  p_759) -> break
c  in CNF:
c     b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ -p_759 ∨ break
c  in DIMACS:
 22841 -22842  22843 -759 1162 0


c  2-1 --> 1
c    (-b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧ -p_759) -> (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0)
c  in CNF:
c     b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_2
c     b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_1
c     b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨  b^{253, 4}_0
c  in DIMACS:
 22841 -22842  22843  759 -22844 0
 22841 -22842  22843  759 -22845 0
 22841 -22842  22843  759  22846 0

c  1-1 --> 0
c    (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0 ∧ -p_759) -> (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧ -b^{253, 4}_0)
c  in CNF:
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_2
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_1
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_0
c  in DIMACS:
 22841  22842 -22843  759 -22844 0
 22841  22842 -22843  759 -22845 0
 22841  22842 -22843  759 -22846 0

c  0-1 --> -1
c    (-b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧ -p_759) -> ( b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0)
c  in CNF:
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨  b^{253, 4}_2
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_1
c     b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨  b^{253, 4}_0
c  in DIMACS:
 22841  22842  22843  759  22844 0
 22841  22842  22843  759 -22845 0
 22841  22842  22843  759  22846 0

c  -1-1 --> -2
c    ( b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧  b^{253, 3}_0 ∧ -p_759) -> ( b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0)
c  in CNF:
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨  b^{253, 4}_2
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨  b^{253, 4}_1
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨  p_759 ∨ -b^{253, 4}_0
c  in DIMACS:
-22841  22842 -22843  759  22844 0
-22841  22842 -22843  759  22845 0
-22841  22842 -22843  759 -22846 0

c  -2-1 --> break 
c    ( b^{253, 3}_2 ∧  b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧ -p_759) -> break
c  in CNF:
c    -b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨  b^{253, 3}_0 ∨  p_759 ∨ break
c  in DIMACS:
-22841 -22842  22843  759 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{253, 3}_2 ∧ -b^{253, 3}_1 ∧ -b^{253, 3}_0 ∧ true) 
c  in CNF:
c    -b^{253, 3}_2 ∨  b^{253, 3}_1 ∨  b^{253, 3}_0 ∨ false 
c  in DIMACS:
-22841  22842  22843  0

c  3 does not represent an automaton state.
c    -(-b^{253, 3}_2 ∧  b^{253, 3}_1 ∧  b^{253, 3}_0 ∧ true) 
c  in CNF:
c     b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ false 
c  in DIMACS:
 22841 -22842 -22843  0
c  -3 does not represent an automaton state.
c    -( b^{253, 3}_2 ∧  b^{253, 3}_1 ∧  b^{253, 3}_0 ∧ true) 
c  in CNF:
c    -b^{253, 3}_2 ∨ -b^{253, 3}_1 ∨ -b^{253, 3}_0 ∨ false 
c  in DIMACS:
-22841 -22842 -22843  0

c i = 4
c  -2+1 --> -1
c    ( b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧  p_1012) -> ( b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧  b^{253, 5}_0)
c  in CNF:
c    -b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨  b^{253, 5}_2
c    -b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_1
c    -b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨  b^{253, 5}_0
c  in DIMACS:
-22844 -22845  22846 -1012  22847 0
-22844 -22845  22846 -1012 -22848 0
-22844 -22845  22846 -1012  22849 0

c  -1+1 --> 0
c    ( b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0 ∧  p_1012) -> (-b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧ -b^{253, 5}_0)
c  in CNF:
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_2
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_1
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_0
c  in DIMACS:
-22844  22845 -22846 -1012 -22847 0
-22844  22845 -22846 -1012 -22848 0
-22844  22845 -22846 -1012 -22849 0

c  0+1 --> 1
c    (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧  p_1012) -> (-b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧  b^{253, 5}_0)
c  in CNF:
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_2
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_1
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨  b^{253, 5}_0
c  in DIMACS:
 22844  22845  22846 -1012 -22847 0
 22844  22845  22846 -1012 -22848 0
 22844  22845  22846 -1012  22849 0

c  1+1 --> 2
c    (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0 ∧  p_1012) -> (-b^{253, 5}_2 ∧  b^{253, 5}_1 ∧ -b^{253, 5}_0)
c  in CNF:
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_2
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨  b^{253, 5}_1
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ -p_1012 ∨ -b^{253, 5}_0
c  in DIMACS:
 22844  22845 -22846 -1012 -22847 0
 22844  22845 -22846 -1012  22848 0
 22844  22845 -22846 -1012 -22849 0

c  2+1 --> break 
c    (-b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧  p_1012) -> break
c  in CNF:
c     b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ -p_1012 ∨ break
c  in DIMACS:
 22844 -22845  22846 -1012 1162 0


c  2-1 --> 1
c    (-b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧ -p_1012) -> (-b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧  b^{253, 5}_0)
c  in CNF:
c     b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_2
c     b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_1
c     b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨  b^{253, 5}_0
c  in DIMACS:
 22844 -22845  22846  1012 -22847 0
 22844 -22845  22846  1012 -22848 0
 22844 -22845  22846  1012  22849 0

c  1-1 --> 0
c    (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0 ∧ -p_1012) -> (-b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧ -b^{253, 5}_0)
c  in CNF:
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_2
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_1
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_0
c  in DIMACS:
 22844  22845 -22846  1012 -22847 0
 22844  22845 -22846  1012 -22848 0
 22844  22845 -22846  1012 -22849 0

c  0-1 --> -1
c    (-b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧ -p_1012) -> ( b^{253, 5}_2 ∧ -b^{253, 5}_1 ∧  b^{253, 5}_0)
c  in CNF:
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨  b^{253, 5}_2
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_1
c     b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨  b^{253, 5}_0
c  in DIMACS:
 22844  22845  22846  1012  22847 0
 22844  22845  22846  1012 -22848 0
 22844  22845  22846  1012  22849 0

c  -1-1 --> -2
c    ( b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧  b^{253, 4}_0 ∧ -p_1012) -> ( b^{253, 5}_2 ∧  b^{253, 5}_1 ∧ -b^{253, 5}_0)
c  in CNF:
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨  b^{253, 5}_2
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨  b^{253, 5}_1
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨  p_1012 ∨ -b^{253, 5}_0
c  in DIMACS:
-22844  22845 -22846  1012  22847 0
-22844  22845 -22846  1012  22848 0
-22844  22845 -22846  1012 -22849 0

c  -2-1 --> break 
c    ( b^{253, 4}_2 ∧  b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧ -p_1012) -> break
c  in CNF:
c    -b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨  b^{253, 4}_0 ∨  p_1012 ∨ break
c  in DIMACS:
-22844 -22845  22846  1012 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{253, 4}_2 ∧ -b^{253, 4}_1 ∧ -b^{253, 4}_0 ∧ true) 
c  in CNF:
c    -b^{253, 4}_2 ∨  b^{253, 4}_1 ∨  b^{253, 4}_0 ∨ false 
c  in DIMACS:
-22844  22845  22846  0

c  3 does not represent an automaton state.
c    -(-b^{253, 4}_2 ∧  b^{253, 4}_1 ∧  b^{253, 4}_0 ∧ true) 
c  in CNF:
c     b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ false 
c  in DIMACS:
 22844 -22845 -22846  0
c  -3 does not represent an automaton state.
c    -( b^{253, 4}_2 ∧  b^{253, 4}_1 ∧  b^{253, 4}_0 ∧ true) 
c  in CNF:
c    -b^{253, 4}_2 ∨ -b^{253, 4}_1 ∨ -b^{253, 4}_0 ∨ false 
c  in DIMACS:
-22844 -22845 -22846  0

c INIT for k = 254
c    -b^{254, 1}_2
c    -b^{254, 1}_1
c    -b^{254, 1}_0
c  in DIMACS:
-22850 0
-22851 0
-22852 0

c Transitions for k = 254
c i = 1
c  -2+1 --> -1
c    ( b^{254, 1}_2 ∧  b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧  p_254) -> ( b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0)
c  in CNF:
c    -b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨  b^{254, 2}_2
c    -b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_1
c    -b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨  b^{254, 2}_0
c  in DIMACS:
-22850 -22851  22852 -254  22853 0
-22850 -22851  22852 -254 -22854 0
-22850 -22851  22852 -254  22855 0

c  -1+1 --> 0
c    ( b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧  b^{254, 1}_0 ∧  p_254) -> (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧ -b^{254, 2}_0)
c  in CNF:
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_2
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_1
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_0
c  in DIMACS:
-22850  22851 -22852 -254 -22853 0
-22850  22851 -22852 -254 -22854 0
-22850  22851 -22852 -254 -22855 0

c  0+1 --> 1
c    (-b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧  p_254) -> (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0)
c  in CNF:
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_2
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_1
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨  b^{254, 2}_0
c  in DIMACS:
 22850  22851  22852 -254 -22853 0
 22850  22851  22852 -254 -22854 0
 22850  22851  22852 -254  22855 0

c  1+1 --> 2
c    (-b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧  b^{254, 1}_0 ∧  p_254) -> (-b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0)
c  in CNF:
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_2
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨  b^{254, 2}_1
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ -p_254 ∨ -b^{254, 2}_0
c  in DIMACS:
 22850  22851 -22852 -254 -22853 0
 22850  22851 -22852 -254  22854 0
 22850  22851 -22852 -254 -22855 0

c  2+1 --> break 
c    (-b^{254, 1}_2 ∧  b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧  p_254) -> break
c  in CNF:
c     b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ -p_254 ∨ break
c  in DIMACS:
 22850 -22851  22852 -254 1162 0


c  2-1 --> 1
c    (-b^{254, 1}_2 ∧  b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧ -p_254) -> (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0)
c  in CNF:
c     b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_2
c     b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_1
c     b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨  b^{254, 2}_0
c  in DIMACS:
 22850 -22851  22852  254 -22853 0
 22850 -22851  22852  254 -22854 0
 22850 -22851  22852  254  22855 0

c  1-1 --> 0
c    (-b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧  b^{254, 1}_0 ∧ -p_254) -> (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧ -b^{254, 2}_0)
c  in CNF:
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_2
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_1
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_0
c  in DIMACS:
 22850  22851 -22852  254 -22853 0
 22850  22851 -22852  254 -22854 0
 22850  22851 -22852  254 -22855 0

c  0-1 --> -1
c    (-b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧ -p_254) -> ( b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0)
c  in CNF:
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨  b^{254, 2}_2
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_1
c     b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨  b^{254, 2}_0
c  in DIMACS:
 22850  22851  22852  254  22853 0
 22850  22851  22852  254 -22854 0
 22850  22851  22852  254  22855 0

c  -1-1 --> -2
c    ( b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧  b^{254, 1}_0 ∧ -p_254) -> ( b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0)
c  in CNF:
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨  b^{254, 2}_2
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨  b^{254, 2}_1
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨  p_254 ∨ -b^{254, 2}_0
c  in DIMACS:
-22850  22851 -22852  254  22853 0
-22850  22851 -22852  254  22854 0
-22850  22851 -22852  254 -22855 0

c  -2-1 --> break 
c    ( b^{254, 1}_2 ∧  b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧ -p_254) -> break
c  in CNF:
c    -b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨  b^{254, 1}_0 ∨  p_254 ∨ break
c  in DIMACS:
-22850 -22851  22852  254 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{254, 1}_2 ∧ -b^{254, 1}_1 ∧ -b^{254, 1}_0 ∧ true) 
c  in CNF:
c    -b^{254, 1}_2 ∨  b^{254, 1}_1 ∨  b^{254, 1}_0 ∨ false 
c  in DIMACS:
-22850  22851  22852  0

c  3 does not represent an automaton state.
c    -(-b^{254, 1}_2 ∧  b^{254, 1}_1 ∧  b^{254, 1}_0 ∧ true) 
c  in CNF:
c     b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ false 
c  in DIMACS:
 22850 -22851 -22852  0
c  -3 does not represent an automaton state.
c    -( b^{254, 1}_2 ∧  b^{254, 1}_1 ∧  b^{254, 1}_0 ∧ true) 
c  in CNF:
c    -b^{254, 1}_2 ∨ -b^{254, 1}_1 ∨ -b^{254, 1}_0 ∨ false 
c  in DIMACS:
-22850 -22851 -22852  0

c i = 2
c  -2+1 --> -1
c    ( b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧  p_508) -> ( b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0)
c  in CNF:
c    -b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨  b^{254, 3}_2
c    -b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_1
c    -b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨  b^{254, 3}_0
c  in DIMACS:
-22853 -22854  22855 -508  22856 0
-22853 -22854  22855 -508 -22857 0
-22853 -22854  22855 -508  22858 0

c  -1+1 --> 0
c    ( b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0 ∧  p_508) -> (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧ -b^{254, 3}_0)
c  in CNF:
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_2
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_1
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_0
c  in DIMACS:
-22853  22854 -22855 -508 -22856 0
-22853  22854 -22855 -508 -22857 0
-22853  22854 -22855 -508 -22858 0

c  0+1 --> 1
c    (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧  p_508) -> (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0)
c  in CNF:
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_2
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_1
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨  b^{254, 3}_0
c  in DIMACS:
 22853  22854  22855 -508 -22856 0
 22853  22854  22855 -508 -22857 0
 22853  22854  22855 -508  22858 0

c  1+1 --> 2
c    (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0 ∧  p_508) -> (-b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0)
c  in CNF:
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_2
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨  b^{254, 3}_1
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ -p_508 ∨ -b^{254, 3}_0
c  in DIMACS:
 22853  22854 -22855 -508 -22856 0
 22853  22854 -22855 -508  22857 0
 22853  22854 -22855 -508 -22858 0

c  2+1 --> break 
c    (-b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧  p_508) -> break
c  in CNF:
c     b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ -p_508 ∨ break
c  in DIMACS:
 22853 -22854  22855 -508 1162 0


c  2-1 --> 1
c    (-b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧ -p_508) -> (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0)
c  in CNF:
c     b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_2
c     b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_1
c     b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨  b^{254, 3}_0
c  in DIMACS:
 22853 -22854  22855  508 -22856 0
 22853 -22854  22855  508 -22857 0
 22853 -22854  22855  508  22858 0

c  1-1 --> 0
c    (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0 ∧ -p_508) -> (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧ -b^{254, 3}_0)
c  in CNF:
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_2
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_1
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_0
c  in DIMACS:
 22853  22854 -22855  508 -22856 0
 22853  22854 -22855  508 -22857 0
 22853  22854 -22855  508 -22858 0

c  0-1 --> -1
c    (-b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧ -p_508) -> ( b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0)
c  in CNF:
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨  b^{254, 3}_2
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_1
c     b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨  b^{254, 3}_0
c  in DIMACS:
 22853  22854  22855  508  22856 0
 22853  22854  22855  508 -22857 0
 22853  22854  22855  508  22858 0

c  -1-1 --> -2
c    ( b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧  b^{254, 2}_0 ∧ -p_508) -> ( b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0)
c  in CNF:
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨  b^{254, 3}_2
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨  b^{254, 3}_1
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨  p_508 ∨ -b^{254, 3}_0
c  in DIMACS:
-22853  22854 -22855  508  22856 0
-22853  22854 -22855  508  22857 0
-22853  22854 -22855  508 -22858 0

c  -2-1 --> break 
c    ( b^{254, 2}_2 ∧  b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧ -p_508) -> break
c  in CNF:
c    -b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨  b^{254, 2}_0 ∨  p_508 ∨ break
c  in DIMACS:
-22853 -22854  22855  508 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{254, 2}_2 ∧ -b^{254, 2}_1 ∧ -b^{254, 2}_0 ∧ true) 
c  in CNF:
c    -b^{254, 2}_2 ∨  b^{254, 2}_1 ∨  b^{254, 2}_0 ∨ false 
c  in DIMACS:
-22853  22854  22855  0

c  3 does not represent an automaton state.
c    -(-b^{254, 2}_2 ∧  b^{254, 2}_1 ∧  b^{254, 2}_0 ∧ true) 
c  in CNF:
c     b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ false 
c  in DIMACS:
 22853 -22854 -22855  0
c  -3 does not represent an automaton state.
c    -( b^{254, 2}_2 ∧  b^{254, 2}_1 ∧  b^{254, 2}_0 ∧ true) 
c  in CNF:
c    -b^{254, 2}_2 ∨ -b^{254, 2}_1 ∨ -b^{254, 2}_0 ∨ false 
c  in DIMACS:
-22853 -22854 -22855  0

c i = 3
c  -2+1 --> -1
c    ( b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧  p_762) -> ( b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0)
c  in CNF:
c    -b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨  b^{254, 4}_2
c    -b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_1
c    -b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨  b^{254, 4}_0
c  in DIMACS:
-22856 -22857  22858 -762  22859 0
-22856 -22857  22858 -762 -22860 0
-22856 -22857  22858 -762  22861 0

c  -1+1 --> 0
c    ( b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0 ∧  p_762) -> (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧ -b^{254, 4}_0)
c  in CNF:
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_2
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_1
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_0
c  in DIMACS:
-22856  22857 -22858 -762 -22859 0
-22856  22857 -22858 -762 -22860 0
-22856  22857 -22858 -762 -22861 0

c  0+1 --> 1
c    (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧  p_762) -> (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0)
c  in CNF:
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_2
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_1
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨  b^{254, 4}_0
c  in DIMACS:
 22856  22857  22858 -762 -22859 0
 22856  22857  22858 -762 -22860 0
 22856  22857  22858 -762  22861 0

c  1+1 --> 2
c    (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0 ∧  p_762) -> (-b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0)
c  in CNF:
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_2
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨  b^{254, 4}_1
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ -p_762 ∨ -b^{254, 4}_0
c  in DIMACS:
 22856  22857 -22858 -762 -22859 0
 22856  22857 -22858 -762  22860 0
 22856  22857 -22858 -762 -22861 0

c  2+1 --> break 
c    (-b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧  p_762) -> break
c  in CNF:
c     b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 22856 -22857  22858 -762 1162 0


c  2-1 --> 1
c    (-b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧ -p_762) -> (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0)
c  in CNF:
c     b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_2
c     b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_1
c     b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨  b^{254, 4}_0
c  in DIMACS:
 22856 -22857  22858  762 -22859 0
 22856 -22857  22858  762 -22860 0
 22856 -22857  22858  762  22861 0

c  1-1 --> 0
c    (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0 ∧ -p_762) -> (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧ -b^{254, 4}_0)
c  in CNF:
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_2
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_1
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_0
c  in DIMACS:
 22856  22857 -22858  762 -22859 0
 22856  22857 -22858  762 -22860 0
 22856  22857 -22858  762 -22861 0

c  0-1 --> -1
c    (-b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧ -p_762) -> ( b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0)
c  in CNF:
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨  b^{254, 4}_2
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_1
c     b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨  b^{254, 4}_0
c  in DIMACS:
 22856  22857  22858  762  22859 0
 22856  22857  22858  762 -22860 0
 22856  22857  22858  762  22861 0

c  -1-1 --> -2
c    ( b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧  b^{254, 3}_0 ∧ -p_762) -> ( b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0)
c  in CNF:
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨  b^{254, 4}_2
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨  b^{254, 4}_1
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨  p_762 ∨ -b^{254, 4}_0
c  in DIMACS:
-22856  22857 -22858  762  22859 0
-22856  22857 -22858  762  22860 0
-22856  22857 -22858  762 -22861 0

c  -2-1 --> break 
c    ( b^{254, 3}_2 ∧  b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨  b^{254, 3}_0 ∨  p_762 ∨ break
c  in DIMACS:
-22856 -22857  22858  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{254, 3}_2 ∧ -b^{254, 3}_1 ∧ -b^{254, 3}_0 ∧ true) 
c  in CNF:
c    -b^{254, 3}_2 ∨  b^{254, 3}_1 ∨  b^{254, 3}_0 ∨ false 
c  in DIMACS:
-22856  22857  22858  0

c  3 does not represent an automaton state.
c    -(-b^{254, 3}_2 ∧  b^{254, 3}_1 ∧  b^{254, 3}_0 ∧ true) 
c  in CNF:
c     b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ false 
c  in DIMACS:
 22856 -22857 -22858  0
c  -3 does not represent an automaton state.
c    -( b^{254, 3}_2 ∧  b^{254, 3}_1 ∧  b^{254, 3}_0 ∧ true) 
c  in CNF:
c    -b^{254, 3}_2 ∨ -b^{254, 3}_1 ∨ -b^{254, 3}_0 ∨ false 
c  in DIMACS:
-22856 -22857 -22858  0

c i = 4
c  -2+1 --> -1
c    ( b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧  p_1016) -> ( b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧  b^{254, 5}_0)
c  in CNF:
c    -b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨  b^{254, 5}_2
c    -b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_1
c    -b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨  b^{254, 5}_0
c  in DIMACS:
-22859 -22860  22861 -1016  22862 0
-22859 -22860  22861 -1016 -22863 0
-22859 -22860  22861 -1016  22864 0

c  -1+1 --> 0
c    ( b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0 ∧  p_1016) -> (-b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧ -b^{254, 5}_0)
c  in CNF:
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_2
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_1
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_0
c  in DIMACS:
-22859  22860 -22861 -1016 -22862 0
-22859  22860 -22861 -1016 -22863 0
-22859  22860 -22861 -1016 -22864 0

c  0+1 --> 1
c    (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧  p_1016) -> (-b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧  b^{254, 5}_0)
c  in CNF:
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_2
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_1
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨  b^{254, 5}_0
c  in DIMACS:
 22859  22860  22861 -1016 -22862 0
 22859  22860  22861 -1016 -22863 0
 22859  22860  22861 -1016  22864 0

c  1+1 --> 2
c    (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0 ∧  p_1016) -> (-b^{254, 5}_2 ∧  b^{254, 5}_1 ∧ -b^{254, 5}_0)
c  in CNF:
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_2
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨  b^{254, 5}_1
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ -p_1016 ∨ -b^{254, 5}_0
c  in DIMACS:
 22859  22860 -22861 -1016 -22862 0
 22859  22860 -22861 -1016  22863 0
 22859  22860 -22861 -1016 -22864 0

c  2+1 --> break 
c    (-b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧  p_1016) -> break
c  in CNF:
c     b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ -p_1016 ∨ break
c  in DIMACS:
 22859 -22860  22861 -1016 1162 0


c  2-1 --> 1
c    (-b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧ -p_1016) -> (-b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧  b^{254, 5}_0)
c  in CNF:
c     b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_2
c     b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_1
c     b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨  b^{254, 5}_0
c  in DIMACS:
 22859 -22860  22861  1016 -22862 0
 22859 -22860  22861  1016 -22863 0
 22859 -22860  22861  1016  22864 0

c  1-1 --> 0
c    (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0 ∧ -p_1016) -> (-b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧ -b^{254, 5}_0)
c  in CNF:
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_2
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_1
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_0
c  in DIMACS:
 22859  22860 -22861  1016 -22862 0
 22859  22860 -22861  1016 -22863 0
 22859  22860 -22861  1016 -22864 0

c  0-1 --> -1
c    (-b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧ -p_1016) -> ( b^{254, 5}_2 ∧ -b^{254, 5}_1 ∧  b^{254, 5}_0)
c  in CNF:
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨  b^{254, 5}_2
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_1
c     b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨  b^{254, 5}_0
c  in DIMACS:
 22859  22860  22861  1016  22862 0
 22859  22860  22861  1016 -22863 0
 22859  22860  22861  1016  22864 0

c  -1-1 --> -2
c    ( b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧  b^{254, 4}_0 ∧ -p_1016) -> ( b^{254, 5}_2 ∧  b^{254, 5}_1 ∧ -b^{254, 5}_0)
c  in CNF:
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨  b^{254, 5}_2
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨  b^{254, 5}_1
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨  p_1016 ∨ -b^{254, 5}_0
c  in DIMACS:
-22859  22860 -22861  1016  22862 0
-22859  22860 -22861  1016  22863 0
-22859  22860 -22861  1016 -22864 0

c  -2-1 --> break 
c    ( b^{254, 4}_2 ∧  b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧ -p_1016) -> break
c  in CNF:
c    -b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨  b^{254, 4}_0 ∨  p_1016 ∨ break
c  in DIMACS:
-22859 -22860  22861  1016 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{254, 4}_2 ∧ -b^{254, 4}_1 ∧ -b^{254, 4}_0 ∧ true) 
c  in CNF:
c    -b^{254, 4}_2 ∨  b^{254, 4}_1 ∨  b^{254, 4}_0 ∨ false 
c  in DIMACS:
-22859  22860  22861  0

c  3 does not represent an automaton state.
c    -(-b^{254, 4}_2 ∧  b^{254, 4}_1 ∧  b^{254, 4}_0 ∧ true) 
c  in CNF:
c     b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ false 
c  in DIMACS:
 22859 -22860 -22861  0
c  -3 does not represent an automaton state.
c    -( b^{254, 4}_2 ∧  b^{254, 4}_1 ∧  b^{254, 4}_0 ∧ true) 
c  in CNF:
c    -b^{254, 4}_2 ∨ -b^{254, 4}_1 ∨ -b^{254, 4}_0 ∨ false 
c  in DIMACS:
-22859 -22860 -22861  0

c INIT for k = 255
c    -b^{255, 1}_2
c    -b^{255, 1}_1
c    -b^{255, 1}_0
c  in DIMACS:
-22865 0
-22866 0
-22867 0

c Transitions for k = 255
c i = 1
c  -2+1 --> -1
c    ( b^{255, 1}_2 ∧  b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧  p_255) -> ( b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0)
c  in CNF:
c    -b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨  b^{255, 2}_2
c    -b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_1
c    -b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨  b^{255, 2}_0
c  in DIMACS:
-22865 -22866  22867 -255  22868 0
-22865 -22866  22867 -255 -22869 0
-22865 -22866  22867 -255  22870 0

c  -1+1 --> 0
c    ( b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧  b^{255, 1}_0 ∧  p_255) -> (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧ -b^{255, 2}_0)
c  in CNF:
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_2
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_1
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_0
c  in DIMACS:
-22865  22866 -22867 -255 -22868 0
-22865  22866 -22867 -255 -22869 0
-22865  22866 -22867 -255 -22870 0

c  0+1 --> 1
c    (-b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧  p_255) -> (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0)
c  in CNF:
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_2
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_1
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨  b^{255, 2}_0
c  in DIMACS:
 22865  22866  22867 -255 -22868 0
 22865  22866  22867 -255 -22869 0
 22865  22866  22867 -255  22870 0

c  1+1 --> 2
c    (-b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧  b^{255, 1}_0 ∧  p_255) -> (-b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0)
c  in CNF:
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_2
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨  b^{255, 2}_1
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ -p_255 ∨ -b^{255, 2}_0
c  in DIMACS:
 22865  22866 -22867 -255 -22868 0
 22865  22866 -22867 -255  22869 0
 22865  22866 -22867 -255 -22870 0

c  2+1 --> break 
c    (-b^{255, 1}_2 ∧  b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧  p_255) -> break
c  in CNF:
c     b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ -p_255 ∨ break
c  in DIMACS:
 22865 -22866  22867 -255 1162 0


c  2-1 --> 1
c    (-b^{255, 1}_2 ∧  b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧ -p_255) -> (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0)
c  in CNF:
c     b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_2
c     b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_1
c     b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨  b^{255, 2}_0
c  in DIMACS:
 22865 -22866  22867  255 -22868 0
 22865 -22866  22867  255 -22869 0
 22865 -22866  22867  255  22870 0

c  1-1 --> 0
c    (-b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧  b^{255, 1}_0 ∧ -p_255) -> (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧ -b^{255, 2}_0)
c  in CNF:
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_2
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_1
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_0
c  in DIMACS:
 22865  22866 -22867  255 -22868 0
 22865  22866 -22867  255 -22869 0
 22865  22866 -22867  255 -22870 0

c  0-1 --> -1
c    (-b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧ -p_255) -> ( b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0)
c  in CNF:
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨  b^{255, 2}_2
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_1
c     b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨  b^{255, 2}_0
c  in DIMACS:
 22865  22866  22867  255  22868 0
 22865  22866  22867  255 -22869 0
 22865  22866  22867  255  22870 0

c  -1-1 --> -2
c    ( b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧  b^{255, 1}_0 ∧ -p_255) -> ( b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0)
c  in CNF:
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨  b^{255, 2}_2
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨  b^{255, 2}_1
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨  p_255 ∨ -b^{255, 2}_0
c  in DIMACS:
-22865  22866 -22867  255  22868 0
-22865  22866 -22867  255  22869 0
-22865  22866 -22867  255 -22870 0

c  -2-1 --> break 
c    ( b^{255, 1}_2 ∧  b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧ -p_255) -> break
c  in CNF:
c    -b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨  b^{255, 1}_0 ∨  p_255 ∨ break
c  in DIMACS:
-22865 -22866  22867  255 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{255, 1}_2 ∧ -b^{255, 1}_1 ∧ -b^{255, 1}_0 ∧ true) 
c  in CNF:
c    -b^{255, 1}_2 ∨  b^{255, 1}_1 ∨  b^{255, 1}_0 ∨ false 
c  in DIMACS:
-22865  22866  22867  0

c  3 does not represent an automaton state.
c    -(-b^{255, 1}_2 ∧  b^{255, 1}_1 ∧  b^{255, 1}_0 ∧ true) 
c  in CNF:
c     b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ false 
c  in DIMACS:
 22865 -22866 -22867  0
c  -3 does not represent an automaton state.
c    -( b^{255, 1}_2 ∧  b^{255, 1}_1 ∧  b^{255, 1}_0 ∧ true) 
c  in CNF:
c    -b^{255, 1}_2 ∨ -b^{255, 1}_1 ∨ -b^{255, 1}_0 ∨ false 
c  in DIMACS:
-22865 -22866 -22867  0

c i = 2
c  -2+1 --> -1
c    ( b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧  p_510) -> ( b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0)
c  in CNF:
c    -b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨  b^{255, 3}_2
c    -b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_1
c    -b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨  b^{255, 3}_0
c  in DIMACS:
-22868 -22869  22870 -510  22871 0
-22868 -22869  22870 -510 -22872 0
-22868 -22869  22870 -510  22873 0

c  -1+1 --> 0
c    ( b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0 ∧  p_510) -> (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧ -b^{255, 3}_0)
c  in CNF:
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_2
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_1
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_0
c  in DIMACS:
-22868  22869 -22870 -510 -22871 0
-22868  22869 -22870 -510 -22872 0
-22868  22869 -22870 -510 -22873 0

c  0+1 --> 1
c    (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧  p_510) -> (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0)
c  in CNF:
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_2
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_1
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨  b^{255, 3}_0
c  in DIMACS:
 22868  22869  22870 -510 -22871 0
 22868  22869  22870 -510 -22872 0
 22868  22869  22870 -510  22873 0

c  1+1 --> 2
c    (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0 ∧  p_510) -> (-b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0)
c  in CNF:
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_2
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨  b^{255, 3}_1
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ -p_510 ∨ -b^{255, 3}_0
c  in DIMACS:
 22868  22869 -22870 -510 -22871 0
 22868  22869 -22870 -510  22872 0
 22868  22869 -22870 -510 -22873 0

c  2+1 --> break 
c    (-b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧  p_510) -> break
c  in CNF:
c     b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ -p_510 ∨ break
c  in DIMACS:
 22868 -22869  22870 -510 1162 0


c  2-1 --> 1
c    (-b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧ -p_510) -> (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0)
c  in CNF:
c     b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_2
c     b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_1
c     b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨  b^{255, 3}_0
c  in DIMACS:
 22868 -22869  22870  510 -22871 0
 22868 -22869  22870  510 -22872 0
 22868 -22869  22870  510  22873 0

c  1-1 --> 0
c    (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0 ∧ -p_510) -> (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧ -b^{255, 3}_0)
c  in CNF:
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_2
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_1
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_0
c  in DIMACS:
 22868  22869 -22870  510 -22871 0
 22868  22869 -22870  510 -22872 0
 22868  22869 -22870  510 -22873 0

c  0-1 --> -1
c    (-b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧ -p_510) -> ( b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0)
c  in CNF:
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨  b^{255, 3}_2
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_1
c     b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨  b^{255, 3}_0
c  in DIMACS:
 22868  22869  22870  510  22871 0
 22868  22869  22870  510 -22872 0
 22868  22869  22870  510  22873 0

c  -1-1 --> -2
c    ( b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧  b^{255, 2}_0 ∧ -p_510) -> ( b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0)
c  in CNF:
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨  b^{255, 3}_2
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨  b^{255, 3}_1
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨  p_510 ∨ -b^{255, 3}_0
c  in DIMACS:
-22868  22869 -22870  510  22871 0
-22868  22869 -22870  510  22872 0
-22868  22869 -22870  510 -22873 0

c  -2-1 --> break 
c    ( b^{255, 2}_2 ∧  b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧ -p_510) -> break
c  in CNF:
c    -b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨  b^{255, 2}_0 ∨  p_510 ∨ break
c  in DIMACS:
-22868 -22869  22870  510 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{255, 2}_2 ∧ -b^{255, 2}_1 ∧ -b^{255, 2}_0 ∧ true) 
c  in CNF:
c    -b^{255, 2}_2 ∨  b^{255, 2}_1 ∨  b^{255, 2}_0 ∨ false 
c  in DIMACS:
-22868  22869  22870  0

c  3 does not represent an automaton state.
c    -(-b^{255, 2}_2 ∧  b^{255, 2}_1 ∧  b^{255, 2}_0 ∧ true) 
c  in CNF:
c     b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ false 
c  in DIMACS:
 22868 -22869 -22870  0
c  -3 does not represent an automaton state.
c    -( b^{255, 2}_2 ∧  b^{255, 2}_1 ∧  b^{255, 2}_0 ∧ true) 
c  in CNF:
c    -b^{255, 2}_2 ∨ -b^{255, 2}_1 ∨ -b^{255, 2}_0 ∨ false 
c  in DIMACS:
-22868 -22869 -22870  0

c i = 3
c  -2+1 --> -1
c    ( b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧  p_765) -> ( b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0)
c  in CNF:
c    -b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨  b^{255, 4}_2
c    -b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_1
c    -b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨  b^{255, 4}_0
c  in DIMACS:
-22871 -22872  22873 -765  22874 0
-22871 -22872  22873 -765 -22875 0
-22871 -22872  22873 -765  22876 0

c  -1+1 --> 0
c    ( b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0 ∧  p_765) -> (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧ -b^{255, 4}_0)
c  in CNF:
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_2
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_1
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_0
c  in DIMACS:
-22871  22872 -22873 -765 -22874 0
-22871  22872 -22873 -765 -22875 0
-22871  22872 -22873 -765 -22876 0

c  0+1 --> 1
c    (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧  p_765) -> (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0)
c  in CNF:
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_2
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_1
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨  b^{255, 4}_0
c  in DIMACS:
 22871  22872  22873 -765 -22874 0
 22871  22872  22873 -765 -22875 0
 22871  22872  22873 -765  22876 0

c  1+1 --> 2
c    (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0 ∧  p_765) -> (-b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0)
c  in CNF:
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_2
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨  b^{255, 4}_1
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ -p_765 ∨ -b^{255, 4}_0
c  in DIMACS:
 22871  22872 -22873 -765 -22874 0
 22871  22872 -22873 -765  22875 0
 22871  22872 -22873 -765 -22876 0

c  2+1 --> break 
c    (-b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧  p_765) -> break
c  in CNF:
c     b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ -p_765 ∨ break
c  in DIMACS:
 22871 -22872  22873 -765 1162 0


c  2-1 --> 1
c    (-b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧ -p_765) -> (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0)
c  in CNF:
c     b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_2
c     b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_1
c     b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨  b^{255, 4}_0
c  in DIMACS:
 22871 -22872  22873  765 -22874 0
 22871 -22872  22873  765 -22875 0
 22871 -22872  22873  765  22876 0

c  1-1 --> 0
c    (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0 ∧ -p_765) -> (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧ -b^{255, 4}_0)
c  in CNF:
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_2
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_1
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_0
c  in DIMACS:
 22871  22872 -22873  765 -22874 0
 22871  22872 -22873  765 -22875 0
 22871  22872 -22873  765 -22876 0

c  0-1 --> -1
c    (-b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧ -p_765) -> ( b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0)
c  in CNF:
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨  b^{255, 4}_2
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_1
c     b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨  b^{255, 4}_0
c  in DIMACS:
 22871  22872  22873  765  22874 0
 22871  22872  22873  765 -22875 0
 22871  22872  22873  765  22876 0

c  -1-1 --> -2
c    ( b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧  b^{255, 3}_0 ∧ -p_765) -> ( b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0)
c  in CNF:
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨  b^{255, 4}_2
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨  b^{255, 4}_1
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨  p_765 ∨ -b^{255, 4}_0
c  in DIMACS:
-22871  22872 -22873  765  22874 0
-22871  22872 -22873  765  22875 0
-22871  22872 -22873  765 -22876 0

c  -2-1 --> break 
c    ( b^{255, 3}_2 ∧  b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧ -p_765) -> break
c  in CNF:
c    -b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨  b^{255, 3}_0 ∨  p_765 ∨ break
c  in DIMACS:
-22871 -22872  22873  765 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{255, 3}_2 ∧ -b^{255, 3}_1 ∧ -b^{255, 3}_0 ∧ true) 
c  in CNF:
c    -b^{255, 3}_2 ∨  b^{255, 3}_1 ∨  b^{255, 3}_0 ∨ false 
c  in DIMACS:
-22871  22872  22873  0

c  3 does not represent an automaton state.
c    -(-b^{255, 3}_2 ∧  b^{255, 3}_1 ∧  b^{255, 3}_0 ∧ true) 
c  in CNF:
c     b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ false 
c  in DIMACS:
 22871 -22872 -22873  0
c  -3 does not represent an automaton state.
c    -( b^{255, 3}_2 ∧  b^{255, 3}_1 ∧  b^{255, 3}_0 ∧ true) 
c  in CNF:
c    -b^{255, 3}_2 ∨ -b^{255, 3}_1 ∨ -b^{255, 3}_0 ∨ false 
c  in DIMACS:
-22871 -22872 -22873  0

c i = 4
c  -2+1 --> -1
c    ( b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧  p_1020) -> ( b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧  b^{255, 5}_0)
c  in CNF:
c    -b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨  b^{255, 5}_2
c    -b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_1
c    -b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨  b^{255, 5}_0
c  in DIMACS:
-22874 -22875  22876 -1020  22877 0
-22874 -22875  22876 -1020 -22878 0
-22874 -22875  22876 -1020  22879 0

c  -1+1 --> 0
c    ( b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0 ∧  p_1020) -> (-b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧ -b^{255, 5}_0)
c  in CNF:
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_2
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_1
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_0
c  in DIMACS:
-22874  22875 -22876 -1020 -22877 0
-22874  22875 -22876 -1020 -22878 0
-22874  22875 -22876 -1020 -22879 0

c  0+1 --> 1
c    (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧  p_1020) -> (-b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧  b^{255, 5}_0)
c  in CNF:
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_2
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_1
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨  b^{255, 5}_0
c  in DIMACS:
 22874  22875  22876 -1020 -22877 0
 22874  22875  22876 -1020 -22878 0
 22874  22875  22876 -1020  22879 0

c  1+1 --> 2
c    (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0 ∧  p_1020) -> (-b^{255, 5}_2 ∧  b^{255, 5}_1 ∧ -b^{255, 5}_0)
c  in CNF:
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_2
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨  b^{255, 5}_1
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ -p_1020 ∨ -b^{255, 5}_0
c  in DIMACS:
 22874  22875 -22876 -1020 -22877 0
 22874  22875 -22876 -1020  22878 0
 22874  22875 -22876 -1020 -22879 0

c  2+1 --> break 
c    (-b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 22874 -22875  22876 -1020 1162 0


c  2-1 --> 1
c    (-b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧ -p_1020) -> (-b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧  b^{255, 5}_0)
c  in CNF:
c     b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_2
c     b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_1
c     b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨  b^{255, 5}_0
c  in DIMACS:
 22874 -22875  22876  1020 -22877 0
 22874 -22875  22876  1020 -22878 0
 22874 -22875  22876  1020  22879 0

c  1-1 --> 0
c    (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0 ∧ -p_1020) -> (-b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧ -b^{255, 5}_0)
c  in CNF:
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_2
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_1
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_0
c  in DIMACS:
 22874  22875 -22876  1020 -22877 0
 22874  22875 -22876  1020 -22878 0
 22874  22875 -22876  1020 -22879 0

c  0-1 --> -1
c    (-b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧ -p_1020) -> ( b^{255, 5}_2 ∧ -b^{255, 5}_1 ∧  b^{255, 5}_0)
c  in CNF:
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨  b^{255, 5}_2
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_1
c     b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨  b^{255, 5}_0
c  in DIMACS:
 22874  22875  22876  1020  22877 0
 22874  22875  22876  1020 -22878 0
 22874  22875  22876  1020  22879 0

c  -1-1 --> -2
c    ( b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧  b^{255, 4}_0 ∧ -p_1020) -> ( b^{255, 5}_2 ∧  b^{255, 5}_1 ∧ -b^{255, 5}_0)
c  in CNF:
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨  b^{255, 5}_2
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨  b^{255, 5}_1
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨  p_1020 ∨ -b^{255, 5}_0
c  in DIMACS:
-22874  22875 -22876  1020  22877 0
-22874  22875 -22876  1020  22878 0
-22874  22875 -22876  1020 -22879 0

c  -2-1 --> break 
c    ( b^{255, 4}_2 ∧  b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨  b^{255, 4}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-22874 -22875  22876  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{255, 4}_2 ∧ -b^{255, 4}_1 ∧ -b^{255, 4}_0 ∧ true) 
c  in CNF:
c    -b^{255, 4}_2 ∨  b^{255, 4}_1 ∨  b^{255, 4}_0 ∨ false 
c  in DIMACS:
-22874  22875  22876  0

c  3 does not represent an automaton state.
c    -(-b^{255, 4}_2 ∧  b^{255, 4}_1 ∧  b^{255, 4}_0 ∧ true) 
c  in CNF:
c     b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ false 
c  in DIMACS:
 22874 -22875 -22876  0
c  -3 does not represent an automaton state.
c    -( b^{255, 4}_2 ∧  b^{255, 4}_1 ∧  b^{255, 4}_0 ∧ true) 
c  in CNF:
c    -b^{255, 4}_2 ∨ -b^{255, 4}_1 ∨ -b^{255, 4}_0 ∨ false 
c  in DIMACS:
-22874 -22875 -22876  0

c INIT for k = 256
c    -b^{256, 1}_2
c    -b^{256, 1}_1
c    -b^{256, 1}_0
c  in DIMACS:
-22880 0
-22881 0
-22882 0

c Transitions for k = 256
c i = 1
c  -2+1 --> -1
c    ( b^{256, 1}_2 ∧  b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧  p_256) -> ( b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0)
c  in CNF:
c    -b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨  b^{256, 2}_2
c    -b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_1
c    -b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨  b^{256, 2}_0
c  in DIMACS:
-22880 -22881  22882 -256  22883 0
-22880 -22881  22882 -256 -22884 0
-22880 -22881  22882 -256  22885 0

c  -1+1 --> 0
c    ( b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧  b^{256, 1}_0 ∧  p_256) -> (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧ -b^{256, 2}_0)
c  in CNF:
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_2
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_1
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_0
c  in DIMACS:
-22880  22881 -22882 -256 -22883 0
-22880  22881 -22882 -256 -22884 0
-22880  22881 -22882 -256 -22885 0

c  0+1 --> 1
c    (-b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧  p_256) -> (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0)
c  in CNF:
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_2
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_1
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨  b^{256, 2}_0
c  in DIMACS:
 22880  22881  22882 -256 -22883 0
 22880  22881  22882 -256 -22884 0
 22880  22881  22882 -256  22885 0

c  1+1 --> 2
c    (-b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧  b^{256, 1}_0 ∧  p_256) -> (-b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0)
c  in CNF:
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_2
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨  b^{256, 2}_1
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ -p_256 ∨ -b^{256, 2}_0
c  in DIMACS:
 22880  22881 -22882 -256 -22883 0
 22880  22881 -22882 -256  22884 0
 22880  22881 -22882 -256 -22885 0

c  2+1 --> break 
c    (-b^{256, 1}_2 ∧  b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧  p_256) -> break
c  in CNF:
c     b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ -p_256 ∨ break
c  in DIMACS:
 22880 -22881  22882 -256 1162 0


c  2-1 --> 1
c    (-b^{256, 1}_2 ∧  b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧ -p_256) -> (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0)
c  in CNF:
c     b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_2
c     b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_1
c     b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨  b^{256, 2}_0
c  in DIMACS:
 22880 -22881  22882  256 -22883 0
 22880 -22881  22882  256 -22884 0
 22880 -22881  22882  256  22885 0

c  1-1 --> 0
c    (-b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧  b^{256, 1}_0 ∧ -p_256) -> (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧ -b^{256, 2}_0)
c  in CNF:
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_2
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_1
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_0
c  in DIMACS:
 22880  22881 -22882  256 -22883 0
 22880  22881 -22882  256 -22884 0
 22880  22881 -22882  256 -22885 0

c  0-1 --> -1
c    (-b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧ -p_256) -> ( b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0)
c  in CNF:
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨  b^{256, 2}_2
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_1
c     b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨  b^{256, 2}_0
c  in DIMACS:
 22880  22881  22882  256  22883 0
 22880  22881  22882  256 -22884 0
 22880  22881  22882  256  22885 0

c  -1-1 --> -2
c    ( b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧  b^{256, 1}_0 ∧ -p_256) -> ( b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0)
c  in CNF:
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨  b^{256, 2}_2
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨  b^{256, 2}_1
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨  p_256 ∨ -b^{256, 2}_0
c  in DIMACS:
-22880  22881 -22882  256  22883 0
-22880  22881 -22882  256  22884 0
-22880  22881 -22882  256 -22885 0

c  -2-1 --> break 
c    ( b^{256, 1}_2 ∧  b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧ -p_256) -> break
c  in CNF:
c    -b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨  b^{256, 1}_0 ∨  p_256 ∨ break
c  in DIMACS:
-22880 -22881  22882  256 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{256, 1}_2 ∧ -b^{256, 1}_1 ∧ -b^{256, 1}_0 ∧ true) 
c  in CNF:
c    -b^{256, 1}_2 ∨  b^{256, 1}_1 ∨  b^{256, 1}_0 ∨ false 
c  in DIMACS:
-22880  22881  22882  0

c  3 does not represent an automaton state.
c    -(-b^{256, 1}_2 ∧  b^{256, 1}_1 ∧  b^{256, 1}_0 ∧ true) 
c  in CNF:
c     b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ false 
c  in DIMACS:
 22880 -22881 -22882  0
c  -3 does not represent an automaton state.
c    -( b^{256, 1}_2 ∧  b^{256, 1}_1 ∧  b^{256, 1}_0 ∧ true) 
c  in CNF:
c    -b^{256, 1}_2 ∨ -b^{256, 1}_1 ∨ -b^{256, 1}_0 ∨ false 
c  in DIMACS:
-22880 -22881 -22882  0

c i = 2
c  -2+1 --> -1
c    ( b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧  p_512) -> ( b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0)
c  in CNF:
c    -b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨  b^{256, 3}_2
c    -b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_1
c    -b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨  b^{256, 3}_0
c  in DIMACS:
-22883 -22884  22885 -512  22886 0
-22883 -22884  22885 -512 -22887 0
-22883 -22884  22885 -512  22888 0

c  -1+1 --> 0
c    ( b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0 ∧  p_512) -> (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧ -b^{256, 3}_0)
c  in CNF:
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_2
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_1
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_0
c  in DIMACS:
-22883  22884 -22885 -512 -22886 0
-22883  22884 -22885 -512 -22887 0
-22883  22884 -22885 -512 -22888 0

c  0+1 --> 1
c    (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧  p_512) -> (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0)
c  in CNF:
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_2
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_1
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨  b^{256, 3}_0
c  in DIMACS:
 22883  22884  22885 -512 -22886 0
 22883  22884  22885 -512 -22887 0
 22883  22884  22885 -512  22888 0

c  1+1 --> 2
c    (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0 ∧  p_512) -> (-b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0)
c  in CNF:
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_2
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨  b^{256, 3}_1
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ -p_512 ∨ -b^{256, 3}_0
c  in DIMACS:
 22883  22884 -22885 -512 -22886 0
 22883  22884 -22885 -512  22887 0
 22883  22884 -22885 -512 -22888 0

c  2+1 --> break 
c    (-b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧  p_512) -> break
c  in CNF:
c     b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ -p_512 ∨ break
c  in DIMACS:
 22883 -22884  22885 -512 1162 0


c  2-1 --> 1
c    (-b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧ -p_512) -> (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0)
c  in CNF:
c     b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_2
c     b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_1
c     b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨  b^{256, 3}_0
c  in DIMACS:
 22883 -22884  22885  512 -22886 0
 22883 -22884  22885  512 -22887 0
 22883 -22884  22885  512  22888 0

c  1-1 --> 0
c    (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0 ∧ -p_512) -> (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧ -b^{256, 3}_0)
c  in CNF:
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_2
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_1
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_0
c  in DIMACS:
 22883  22884 -22885  512 -22886 0
 22883  22884 -22885  512 -22887 0
 22883  22884 -22885  512 -22888 0

c  0-1 --> -1
c    (-b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧ -p_512) -> ( b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0)
c  in CNF:
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨  b^{256, 3}_2
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_1
c     b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨  b^{256, 3}_0
c  in DIMACS:
 22883  22884  22885  512  22886 0
 22883  22884  22885  512 -22887 0
 22883  22884  22885  512  22888 0

c  -1-1 --> -2
c    ( b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧  b^{256, 2}_0 ∧ -p_512) -> ( b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0)
c  in CNF:
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨  b^{256, 3}_2
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨  b^{256, 3}_1
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨  p_512 ∨ -b^{256, 3}_0
c  in DIMACS:
-22883  22884 -22885  512  22886 0
-22883  22884 -22885  512  22887 0
-22883  22884 -22885  512 -22888 0

c  -2-1 --> break 
c    ( b^{256, 2}_2 ∧  b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧ -p_512) -> break
c  in CNF:
c    -b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨  b^{256, 2}_0 ∨  p_512 ∨ break
c  in DIMACS:
-22883 -22884  22885  512 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{256, 2}_2 ∧ -b^{256, 2}_1 ∧ -b^{256, 2}_0 ∧ true) 
c  in CNF:
c    -b^{256, 2}_2 ∨  b^{256, 2}_1 ∨  b^{256, 2}_0 ∨ false 
c  in DIMACS:
-22883  22884  22885  0

c  3 does not represent an automaton state.
c    -(-b^{256, 2}_2 ∧  b^{256, 2}_1 ∧  b^{256, 2}_0 ∧ true) 
c  in CNF:
c     b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ false 
c  in DIMACS:
 22883 -22884 -22885  0
c  -3 does not represent an automaton state.
c    -( b^{256, 2}_2 ∧  b^{256, 2}_1 ∧  b^{256, 2}_0 ∧ true) 
c  in CNF:
c    -b^{256, 2}_2 ∨ -b^{256, 2}_1 ∨ -b^{256, 2}_0 ∨ false 
c  in DIMACS:
-22883 -22884 -22885  0

c i = 3
c  -2+1 --> -1
c    ( b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧  p_768) -> ( b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0)
c  in CNF:
c    -b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨  b^{256, 4}_2
c    -b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_1
c    -b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨  b^{256, 4}_0
c  in DIMACS:
-22886 -22887  22888 -768  22889 0
-22886 -22887  22888 -768 -22890 0
-22886 -22887  22888 -768  22891 0

c  -1+1 --> 0
c    ( b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0 ∧  p_768) -> (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧ -b^{256, 4}_0)
c  in CNF:
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_2
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_1
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_0
c  in DIMACS:
-22886  22887 -22888 -768 -22889 0
-22886  22887 -22888 -768 -22890 0
-22886  22887 -22888 -768 -22891 0

c  0+1 --> 1
c    (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧  p_768) -> (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0)
c  in CNF:
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_2
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_1
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨  b^{256, 4}_0
c  in DIMACS:
 22886  22887  22888 -768 -22889 0
 22886  22887  22888 -768 -22890 0
 22886  22887  22888 -768  22891 0

c  1+1 --> 2
c    (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0 ∧  p_768) -> (-b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0)
c  in CNF:
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_2
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨  b^{256, 4}_1
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ -p_768 ∨ -b^{256, 4}_0
c  in DIMACS:
 22886  22887 -22888 -768 -22889 0
 22886  22887 -22888 -768  22890 0
 22886  22887 -22888 -768 -22891 0

c  2+1 --> break 
c    (-b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧  p_768) -> break
c  in CNF:
c     b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 22886 -22887  22888 -768 1162 0


c  2-1 --> 1
c    (-b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧ -p_768) -> (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0)
c  in CNF:
c     b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_2
c     b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_1
c     b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨  b^{256, 4}_0
c  in DIMACS:
 22886 -22887  22888  768 -22889 0
 22886 -22887  22888  768 -22890 0
 22886 -22887  22888  768  22891 0

c  1-1 --> 0
c    (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0 ∧ -p_768) -> (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧ -b^{256, 4}_0)
c  in CNF:
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_2
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_1
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_0
c  in DIMACS:
 22886  22887 -22888  768 -22889 0
 22886  22887 -22888  768 -22890 0
 22886  22887 -22888  768 -22891 0

c  0-1 --> -1
c    (-b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧ -p_768) -> ( b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0)
c  in CNF:
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨  b^{256, 4}_2
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_1
c     b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨  b^{256, 4}_0
c  in DIMACS:
 22886  22887  22888  768  22889 0
 22886  22887  22888  768 -22890 0
 22886  22887  22888  768  22891 0

c  -1-1 --> -2
c    ( b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧  b^{256, 3}_0 ∧ -p_768) -> ( b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0)
c  in CNF:
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨  b^{256, 4}_2
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨  b^{256, 4}_1
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨  p_768 ∨ -b^{256, 4}_0
c  in DIMACS:
-22886  22887 -22888  768  22889 0
-22886  22887 -22888  768  22890 0
-22886  22887 -22888  768 -22891 0

c  -2-1 --> break 
c    ( b^{256, 3}_2 ∧  b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨  b^{256, 3}_0 ∨  p_768 ∨ break
c  in DIMACS:
-22886 -22887  22888  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{256, 3}_2 ∧ -b^{256, 3}_1 ∧ -b^{256, 3}_0 ∧ true) 
c  in CNF:
c    -b^{256, 3}_2 ∨  b^{256, 3}_1 ∨  b^{256, 3}_0 ∨ false 
c  in DIMACS:
-22886  22887  22888  0

c  3 does not represent an automaton state.
c    -(-b^{256, 3}_2 ∧  b^{256, 3}_1 ∧  b^{256, 3}_0 ∧ true) 
c  in CNF:
c     b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ false 
c  in DIMACS:
 22886 -22887 -22888  0
c  -3 does not represent an automaton state.
c    -( b^{256, 3}_2 ∧  b^{256, 3}_1 ∧  b^{256, 3}_0 ∧ true) 
c  in CNF:
c    -b^{256, 3}_2 ∨ -b^{256, 3}_1 ∨ -b^{256, 3}_0 ∨ false 
c  in DIMACS:
-22886 -22887 -22888  0

c i = 4
c  -2+1 --> -1
c    ( b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧  p_1024) -> ( b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧  b^{256, 5}_0)
c  in CNF:
c    -b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨  b^{256, 5}_2
c    -b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_1
c    -b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨  b^{256, 5}_0
c  in DIMACS:
-22889 -22890  22891 -1024  22892 0
-22889 -22890  22891 -1024 -22893 0
-22889 -22890  22891 -1024  22894 0

c  -1+1 --> 0
c    ( b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0 ∧  p_1024) -> (-b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧ -b^{256, 5}_0)
c  in CNF:
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_2
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_1
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_0
c  in DIMACS:
-22889  22890 -22891 -1024 -22892 0
-22889  22890 -22891 -1024 -22893 0
-22889  22890 -22891 -1024 -22894 0

c  0+1 --> 1
c    (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧  p_1024) -> (-b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧  b^{256, 5}_0)
c  in CNF:
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_2
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_1
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨  b^{256, 5}_0
c  in DIMACS:
 22889  22890  22891 -1024 -22892 0
 22889  22890  22891 -1024 -22893 0
 22889  22890  22891 -1024  22894 0

c  1+1 --> 2
c    (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0 ∧  p_1024) -> (-b^{256, 5}_2 ∧  b^{256, 5}_1 ∧ -b^{256, 5}_0)
c  in CNF:
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_2
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨  b^{256, 5}_1
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ -p_1024 ∨ -b^{256, 5}_0
c  in DIMACS:
 22889  22890 -22891 -1024 -22892 0
 22889  22890 -22891 -1024  22893 0
 22889  22890 -22891 -1024 -22894 0

c  2+1 --> break 
c    (-b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧  p_1024) -> break
c  in CNF:
c     b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ -p_1024 ∨ break
c  in DIMACS:
 22889 -22890  22891 -1024 1162 0


c  2-1 --> 1
c    (-b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧ -p_1024) -> (-b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧  b^{256, 5}_0)
c  in CNF:
c     b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_2
c     b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_1
c     b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨  b^{256, 5}_0
c  in DIMACS:
 22889 -22890  22891  1024 -22892 0
 22889 -22890  22891  1024 -22893 0
 22889 -22890  22891  1024  22894 0

c  1-1 --> 0
c    (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0 ∧ -p_1024) -> (-b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧ -b^{256, 5}_0)
c  in CNF:
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_2
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_1
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_0
c  in DIMACS:
 22889  22890 -22891  1024 -22892 0
 22889  22890 -22891  1024 -22893 0
 22889  22890 -22891  1024 -22894 0

c  0-1 --> -1
c    (-b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧ -p_1024) -> ( b^{256, 5}_2 ∧ -b^{256, 5}_1 ∧  b^{256, 5}_0)
c  in CNF:
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨  b^{256, 5}_2
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_1
c     b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨  b^{256, 5}_0
c  in DIMACS:
 22889  22890  22891  1024  22892 0
 22889  22890  22891  1024 -22893 0
 22889  22890  22891  1024  22894 0

c  -1-1 --> -2
c    ( b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧  b^{256, 4}_0 ∧ -p_1024) -> ( b^{256, 5}_2 ∧  b^{256, 5}_1 ∧ -b^{256, 5}_0)
c  in CNF:
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨  b^{256, 5}_2
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨  b^{256, 5}_1
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨  p_1024 ∨ -b^{256, 5}_0
c  in DIMACS:
-22889  22890 -22891  1024  22892 0
-22889  22890 -22891  1024  22893 0
-22889  22890 -22891  1024 -22894 0

c  -2-1 --> break 
c    ( b^{256, 4}_2 ∧  b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧ -p_1024) -> break
c  in CNF:
c    -b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨  b^{256, 4}_0 ∨  p_1024 ∨ break
c  in DIMACS:
-22889 -22890  22891  1024 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{256, 4}_2 ∧ -b^{256, 4}_1 ∧ -b^{256, 4}_0 ∧ true) 
c  in CNF:
c    -b^{256, 4}_2 ∨  b^{256, 4}_1 ∨  b^{256, 4}_0 ∨ false 
c  in DIMACS:
-22889  22890  22891  0

c  3 does not represent an automaton state.
c    -(-b^{256, 4}_2 ∧  b^{256, 4}_1 ∧  b^{256, 4}_0 ∧ true) 
c  in CNF:
c     b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ false 
c  in DIMACS:
 22889 -22890 -22891  0
c  -3 does not represent an automaton state.
c    -( b^{256, 4}_2 ∧  b^{256, 4}_1 ∧  b^{256, 4}_0 ∧ true) 
c  in CNF:
c    -b^{256, 4}_2 ∨ -b^{256, 4}_1 ∨ -b^{256, 4}_0 ∨ false 
c  in DIMACS:
-22889 -22890 -22891  0

c INIT for k = 257
c    -b^{257, 1}_2
c    -b^{257, 1}_1
c    -b^{257, 1}_0
c  in DIMACS:
-22895 0
-22896 0
-22897 0

c Transitions for k = 257
c i = 1
c  -2+1 --> -1
c    ( b^{257, 1}_2 ∧  b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧  p_257) -> ( b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0)
c  in CNF:
c    -b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨  b^{257, 2}_2
c    -b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_1
c    -b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨  b^{257, 2}_0
c  in DIMACS:
-22895 -22896  22897 -257  22898 0
-22895 -22896  22897 -257 -22899 0
-22895 -22896  22897 -257  22900 0

c  -1+1 --> 0
c    ( b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧  b^{257, 1}_0 ∧  p_257) -> (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧ -b^{257, 2}_0)
c  in CNF:
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_2
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_1
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_0
c  in DIMACS:
-22895  22896 -22897 -257 -22898 0
-22895  22896 -22897 -257 -22899 0
-22895  22896 -22897 -257 -22900 0

c  0+1 --> 1
c    (-b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧  p_257) -> (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0)
c  in CNF:
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_2
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_1
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨  b^{257, 2}_0
c  in DIMACS:
 22895  22896  22897 -257 -22898 0
 22895  22896  22897 -257 -22899 0
 22895  22896  22897 -257  22900 0

c  1+1 --> 2
c    (-b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧  b^{257, 1}_0 ∧  p_257) -> (-b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0)
c  in CNF:
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_2
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨  b^{257, 2}_1
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ -p_257 ∨ -b^{257, 2}_0
c  in DIMACS:
 22895  22896 -22897 -257 -22898 0
 22895  22896 -22897 -257  22899 0
 22895  22896 -22897 -257 -22900 0

c  2+1 --> break 
c    (-b^{257, 1}_2 ∧  b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧  p_257) -> break
c  in CNF:
c     b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ -p_257 ∨ break
c  in DIMACS:
 22895 -22896  22897 -257 1162 0


c  2-1 --> 1
c    (-b^{257, 1}_2 ∧  b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧ -p_257) -> (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0)
c  in CNF:
c     b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_2
c     b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_1
c     b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨  b^{257, 2}_0
c  in DIMACS:
 22895 -22896  22897  257 -22898 0
 22895 -22896  22897  257 -22899 0
 22895 -22896  22897  257  22900 0

c  1-1 --> 0
c    (-b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧  b^{257, 1}_0 ∧ -p_257) -> (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧ -b^{257, 2}_0)
c  in CNF:
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_2
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_1
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_0
c  in DIMACS:
 22895  22896 -22897  257 -22898 0
 22895  22896 -22897  257 -22899 0
 22895  22896 -22897  257 -22900 0

c  0-1 --> -1
c    (-b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧ -p_257) -> ( b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0)
c  in CNF:
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨  b^{257, 2}_2
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_1
c     b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨  b^{257, 2}_0
c  in DIMACS:
 22895  22896  22897  257  22898 0
 22895  22896  22897  257 -22899 0
 22895  22896  22897  257  22900 0

c  -1-1 --> -2
c    ( b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧  b^{257, 1}_0 ∧ -p_257) -> ( b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0)
c  in CNF:
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨  b^{257, 2}_2
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨  b^{257, 2}_1
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨  p_257 ∨ -b^{257, 2}_0
c  in DIMACS:
-22895  22896 -22897  257  22898 0
-22895  22896 -22897  257  22899 0
-22895  22896 -22897  257 -22900 0

c  -2-1 --> break 
c    ( b^{257, 1}_2 ∧  b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧ -p_257) -> break
c  in CNF:
c    -b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨  b^{257, 1}_0 ∨  p_257 ∨ break
c  in DIMACS:
-22895 -22896  22897  257 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{257, 1}_2 ∧ -b^{257, 1}_1 ∧ -b^{257, 1}_0 ∧ true) 
c  in CNF:
c    -b^{257, 1}_2 ∨  b^{257, 1}_1 ∨  b^{257, 1}_0 ∨ false 
c  in DIMACS:
-22895  22896  22897  0

c  3 does not represent an automaton state.
c    -(-b^{257, 1}_2 ∧  b^{257, 1}_1 ∧  b^{257, 1}_0 ∧ true) 
c  in CNF:
c     b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ false 
c  in DIMACS:
 22895 -22896 -22897  0
c  -3 does not represent an automaton state.
c    -( b^{257, 1}_2 ∧  b^{257, 1}_1 ∧  b^{257, 1}_0 ∧ true) 
c  in CNF:
c    -b^{257, 1}_2 ∨ -b^{257, 1}_1 ∨ -b^{257, 1}_0 ∨ false 
c  in DIMACS:
-22895 -22896 -22897  0

c i = 2
c  -2+1 --> -1
c    ( b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧  p_514) -> ( b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0)
c  in CNF:
c    -b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨  b^{257, 3}_2
c    -b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_1
c    -b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨  b^{257, 3}_0
c  in DIMACS:
-22898 -22899  22900 -514  22901 0
-22898 -22899  22900 -514 -22902 0
-22898 -22899  22900 -514  22903 0

c  -1+1 --> 0
c    ( b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0 ∧  p_514) -> (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧ -b^{257, 3}_0)
c  in CNF:
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_2
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_1
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_0
c  in DIMACS:
-22898  22899 -22900 -514 -22901 0
-22898  22899 -22900 -514 -22902 0
-22898  22899 -22900 -514 -22903 0

c  0+1 --> 1
c    (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧  p_514) -> (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0)
c  in CNF:
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_2
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_1
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨  b^{257, 3}_0
c  in DIMACS:
 22898  22899  22900 -514 -22901 0
 22898  22899  22900 -514 -22902 0
 22898  22899  22900 -514  22903 0

c  1+1 --> 2
c    (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0 ∧  p_514) -> (-b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0)
c  in CNF:
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_2
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨  b^{257, 3}_1
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ -p_514 ∨ -b^{257, 3}_0
c  in DIMACS:
 22898  22899 -22900 -514 -22901 0
 22898  22899 -22900 -514  22902 0
 22898  22899 -22900 -514 -22903 0

c  2+1 --> break 
c    (-b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧  p_514) -> break
c  in CNF:
c     b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ -p_514 ∨ break
c  in DIMACS:
 22898 -22899  22900 -514 1162 0


c  2-1 --> 1
c    (-b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧ -p_514) -> (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0)
c  in CNF:
c     b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_2
c     b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_1
c     b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨  b^{257, 3}_0
c  in DIMACS:
 22898 -22899  22900  514 -22901 0
 22898 -22899  22900  514 -22902 0
 22898 -22899  22900  514  22903 0

c  1-1 --> 0
c    (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0 ∧ -p_514) -> (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧ -b^{257, 3}_0)
c  in CNF:
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_2
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_1
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_0
c  in DIMACS:
 22898  22899 -22900  514 -22901 0
 22898  22899 -22900  514 -22902 0
 22898  22899 -22900  514 -22903 0

c  0-1 --> -1
c    (-b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧ -p_514) -> ( b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0)
c  in CNF:
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨  b^{257, 3}_2
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_1
c     b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨  b^{257, 3}_0
c  in DIMACS:
 22898  22899  22900  514  22901 0
 22898  22899  22900  514 -22902 0
 22898  22899  22900  514  22903 0

c  -1-1 --> -2
c    ( b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧  b^{257, 2}_0 ∧ -p_514) -> ( b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0)
c  in CNF:
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨  b^{257, 3}_2
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨  b^{257, 3}_1
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨  p_514 ∨ -b^{257, 3}_0
c  in DIMACS:
-22898  22899 -22900  514  22901 0
-22898  22899 -22900  514  22902 0
-22898  22899 -22900  514 -22903 0

c  -2-1 --> break 
c    ( b^{257, 2}_2 ∧  b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧ -p_514) -> break
c  in CNF:
c    -b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨  b^{257, 2}_0 ∨  p_514 ∨ break
c  in DIMACS:
-22898 -22899  22900  514 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{257, 2}_2 ∧ -b^{257, 2}_1 ∧ -b^{257, 2}_0 ∧ true) 
c  in CNF:
c    -b^{257, 2}_2 ∨  b^{257, 2}_1 ∨  b^{257, 2}_0 ∨ false 
c  in DIMACS:
-22898  22899  22900  0

c  3 does not represent an automaton state.
c    -(-b^{257, 2}_2 ∧  b^{257, 2}_1 ∧  b^{257, 2}_0 ∧ true) 
c  in CNF:
c     b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ false 
c  in DIMACS:
 22898 -22899 -22900  0
c  -3 does not represent an automaton state.
c    -( b^{257, 2}_2 ∧  b^{257, 2}_1 ∧  b^{257, 2}_0 ∧ true) 
c  in CNF:
c    -b^{257, 2}_2 ∨ -b^{257, 2}_1 ∨ -b^{257, 2}_0 ∨ false 
c  in DIMACS:
-22898 -22899 -22900  0

c i = 3
c  -2+1 --> -1
c    ( b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧  p_771) -> ( b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0)
c  in CNF:
c    -b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨  b^{257, 4}_2
c    -b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_1
c    -b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨  b^{257, 4}_0
c  in DIMACS:
-22901 -22902  22903 -771  22904 0
-22901 -22902  22903 -771 -22905 0
-22901 -22902  22903 -771  22906 0

c  -1+1 --> 0
c    ( b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0 ∧  p_771) -> (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧ -b^{257, 4}_0)
c  in CNF:
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_2
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_1
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_0
c  in DIMACS:
-22901  22902 -22903 -771 -22904 0
-22901  22902 -22903 -771 -22905 0
-22901  22902 -22903 -771 -22906 0

c  0+1 --> 1
c    (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧  p_771) -> (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0)
c  in CNF:
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_2
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_1
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨  b^{257, 4}_0
c  in DIMACS:
 22901  22902  22903 -771 -22904 0
 22901  22902  22903 -771 -22905 0
 22901  22902  22903 -771  22906 0

c  1+1 --> 2
c    (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0 ∧  p_771) -> (-b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0)
c  in CNF:
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_2
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨  b^{257, 4}_1
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ -p_771 ∨ -b^{257, 4}_0
c  in DIMACS:
 22901  22902 -22903 -771 -22904 0
 22901  22902 -22903 -771  22905 0
 22901  22902 -22903 -771 -22906 0

c  2+1 --> break 
c    (-b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧  p_771) -> break
c  in CNF:
c     b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ -p_771 ∨ break
c  in DIMACS:
 22901 -22902  22903 -771 1162 0


c  2-1 --> 1
c    (-b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧ -p_771) -> (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0)
c  in CNF:
c     b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_2
c     b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_1
c     b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨  b^{257, 4}_0
c  in DIMACS:
 22901 -22902  22903  771 -22904 0
 22901 -22902  22903  771 -22905 0
 22901 -22902  22903  771  22906 0

c  1-1 --> 0
c    (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0 ∧ -p_771) -> (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧ -b^{257, 4}_0)
c  in CNF:
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_2
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_1
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_0
c  in DIMACS:
 22901  22902 -22903  771 -22904 0
 22901  22902 -22903  771 -22905 0
 22901  22902 -22903  771 -22906 0

c  0-1 --> -1
c    (-b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧ -p_771) -> ( b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0)
c  in CNF:
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨  b^{257, 4}_2
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_1
c     b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨  b^{257, 4}_0
c  in DIMACS:
 22901  22902  22903  771  22904 0
 22901  22902  22903  771 -22905 0
 22901  22902  22903  771  22906 0

c  -1-1 --> -2
c    ( b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧  b^{257, 3}_0 ∧ -p_771) -> ( b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0)
c  in CNF:
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨  b^{257, 4}_2
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨  b^{257, 4}_1
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨  p_771 ∨ -b^{257, 4}_0
c  in DIMACS:
-22901  22902 -22903  771  22904 0
-22901  22902 -22903  771  22905 0
-22901  22902 -22903  771 -22906 0

c  -2-1 --> break 
c    ( b^{257, 3}_2 ∧  b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧ -p_771) -> break
c  in CNF:
c    -b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨  b^{257, 3}_0 ∨  p_771 ∨ break
c  in DIMACS:
-22901 -22902  22903  771 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{257, 3}_2 ∧ -b^{257, 3}_1 ∧ -b^{257, 3}_0 ∧ true) 
c  in CNF:
c    -b^{257, 3}_2 ∨  b^{257, 3}_1 ∨  b^{257, 3}_0 ∨ false 
c  in DIMACS:
-22901  22902  22903  0

c  3 does not represent an automaton state.
c    -(-b^{257, 3}_2 ∧  b^{257, 3}_1 ∧  b^{257, 3}_0 ∧ true) 
c  in CNF:
c     b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ false 
c  in DIMACS:
 22901 -22902 -22903  0
c  -3 does not represent an automaton state.
c    -( b^{257, 3}_2 ∧  b^{257, 3}_1 ∧  b^{257, 3}_0 ∧ true) 
c  in CNF:
c    -b^{257, 3}_2 ∨ -b^{257, 3}_1 ∨ -b^{257, 3}_0 ∨ false 
c  in DIMACS:
-22901 -22902 -22903  0

c i = 4
c  -2+1 --> -1
c    ( b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧  p_1028) -> ( b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧  b^{257, 5}_0)
c  in CNF:
c    -b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨  b^{257, 5}_2
c    -b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_1
c    -b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨  b^{257, 5}_0
c  in DIMACS:
-22904 -22905  22906 -1028  22907 0
-22904 -22905  22906 -1028 -22908 0
-22904 -22905  22906 -1028  22909 0

c  -1+1 --> 0
c    ( b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0 ∧  p_1028) -> (-b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧ -b^{257, 5}_0)
c  in CNF:
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_2
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_1
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_0
c  in DIMACS:
-22904  22905 -22906 -1028 -22907 0
-22904  22905 -22906 -1028 -22908 0
-22904  22905 -22906 -1028 -22909 0

c  0+1 --> 1
c    (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧  p_1028) -> (-b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧  b^{257, 5}_0)
c  in CNF:
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_2
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_1
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨  b^{257, 5}_0
c  in DIMACS:
 22904  22905  22906 -1028 -22907 0
 22904  22905  22906 -1028 -22908 0
 22904  22905  22906 -1028  22909 0

c  1+1 --> 2
c    (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0 ∧  p_1028) -> (-b^{257, 5}_2 ∧  b^{257, 5}_1 ∧ -b^{257, 5}_0)
c  in CNF:
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_2
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨  b^{257, 5}_1
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ -p_1028 ∨ -b^{257, 5}_0
c  in DIMACS:
 22904  22905 -22906 -1028 -22907 0
 22904  22905 -22906 -1028  22908 0
 22904  22905 -22906 -1028 -22909 0

c  2+1 --> break 
c    (-b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧  p_1028) -> break
c  in CNF:
c     b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ -p_1028 ∨ break
c  in DIMACS:
 22904 -22905  22906 -1028 1162 0


c  2-1 --> 1
c    (-b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧ -p_1028) -> (-b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧  b^{257, 5}_0)
c  in CNF:
c     b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_2
c     b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_1
c     b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨  b^{257, 5}_0
c  in DIMACS:
 22904 -22905  22906  1028 -22907 0
 22904 -22905  22906  1028 -22908 0
 22904 -22905  22906  1028  22909 0

c  1-1 --> 0
c    (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0 ∧ -p_1028) -> (-b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧ -b^{257, 5}_0)
c  in CNF:
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_2
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_1
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_0
c  in DIMACS:
 22904  22905 -22906  1028 -22907 0
 22904  22905 -22906  1028 -22908 0
 22904  22905 -22906  1028 -22909 0

c  0-1 --> -1
c    (-b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧ -p_1028) -> ( b^{257, 5}_2 ∧ -b^{257, 5}_1 ∧  b^{257, 5}_0)
c  in CNF:
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨  b^{257, 5}_2
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_1
c     b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨  b^{257, 5}_0
c  in DIMACS:
 22904  22905  22906  1028  22907 0
 22904  22905  22906  1028 -22908 0
 22904  22905  22906  1028  22909 0

c  -1-1 --> -2
c    ( b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧  b^{257, 4}_0 ∧ -p_1028) -> ( b^{257, 5}_2 ∧  b^{257, 5}_1 ∧ -b^{257, 5}_0)
c  in CNF:
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨  b^{257, 5}_2
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨  b^{257, 5}_1
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨  p_1028 ∨ -b^{257, 5}_0
c  in DIMACS:
-22904  22905 -22906  1028  22907 0
-22904  22905 -22906  1028  22908 0
-22904  22905 -22906  1028 -22909 0

c  -2-1 --> break 
c    ( b^{257, 4}_2 ∧  b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧ -p_1028) -> break
c  in CNF:
c    -b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨  b^{257, 4}_0 ∨  p_1028 ∨ break
c  in DIMACS:
-22904 -22905  22906  1028 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{257, 4}_2 ∧ -b^{257, 4}_1 ∧ -b^{257, 4}_0 ∧ true) 
c  in CNF:
c    -b^{257, 4}_2 ∨  b^{257, 4}_1 ∨  b^{257, 4}_0 ∨ false 
c  in DIMACS:
-22904  22905  22906  0

c  3 does not represent an automaton state.
c    -(-b^{257, 4}_2 ∧  b^{257, 4}_1 ∧  b^{257, 4}_0 ∧ true) 
c  in CNF:
c     b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ false 
c  in DIMACS:
 22904 -22905 -22906  0
c  -3 does not represent an automaton state.
c    -( b^{257, 4}_2 ∧  b^{257, 4}_1 ∧  b^{257, 4}_0 ∧ true) 
c  in CNF:
c    -b^{257, 4}_2 ∨ -b^{257, 4}_1 ∨ -b^{257, 4}_0 ∨ false 
c  in DIMACS:
-22904 -22905 -22906  0

c INIT for k = 258
c    -b^{258, 1}_2
c    -b^{258, 1}_1
c    -b^{258, 1}_0
c  in DIMACS:
-22910 0
-22911 0
-22912 0

c Transitions for k = 258
c i = 1
c  -2+1 --> -1
c    ( b^{258, 1}_2 ∧  b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧  p_258) -> ( b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0)
c  in CNF:
c    -b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨  b^{258, 2}_2
c    -b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_1
c    -b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨  b^{258, 2}_0
c  in DIMACS:
-22910 -22911  22912 -258  22913 0
-22910 -22911  22912 -258 -22914 0
-22910 -22911  22912 -258  22915 0

c  -1+1 --> 0
c    ( b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧  b^{258, 1}_0 ∧  p_258) -> (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧ -b^{258, 2}_0)
c  in CNF:
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_2
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_1
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_0
c  in DIMACS:
-22910  22911 -22912 -258 -22913 0
-22910  22911 -22912 -258 -22914 0
-22910  22911 -22912 -258 -22915 0

c  0+1 --> 1
c    (-b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧  p_258) -> (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0)
c  in CNF:
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_2
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_1
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨  b^{258, 2}_0
c  in DIMACS:
 22910  22911  22912 -258 -22913 0
 22910  22911  22912 -258 -22914 0
 22910  22911  22912 -258  22915 0

c  1+1 --> 2
c    (-b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧  b^{258, 1}_0 ∧  p_258) -> (-b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0)
c  in CNF:
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_2
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨  b^{258, 2}_1
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ -p_258 ∨ -b^{258, 2}_0
c  in DIMACS:
 22910  22911 -22912 -258 -22913 0
 22910  22911 -22912 -258  22914 0
 22910  22911 -22912 -258 -22915 0

c  2+1 --> break 
c    (-b^{258, 1}_2 ∧  b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧  p_258) -> break
c  in CNF:
c     b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ -p_258 ∨ break
c  in DIMACS:
 22910 -22911  22912 -258 1162 0


c  2-1 --> 1
c    (-b^{258, 1}_2 ∧  b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧ -p_258) -> (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0)
c  in CNF:
c     b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_2
c     b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_1
c     b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨  b^{258, 2}_0
c  in DIMACS:
 22910 -22911  22912  258 -22913 0
 22910 -22911  22912  258 -22914 0
 22910 -22911  22912  258  22915 0

c  1-1 --> 0
c    (-b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧  b^{258, 1}_0 ∧ -p_258) -> (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧ -b^{258, 2}_0)
c  in CNF:
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_2
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_1
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_0
c  in DIMACS:
 22910  22911 -22912  258 -22913 0
 22910  22911 -22912  258 -22914 0
 22910  22911 -22912  258 -22915 0

c  0-1 --> -1
c    (-b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧ -p_258) -> ( b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0)
c  in CNF:
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨  b^{258, 2}_2
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_1
c     b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨  b^{258, 2}_0
c  in DIMACS:
 22910  22911  22912  258  22913 0
 22910  22911  22912  258 -22914 0
 22910  22911  22912  258  22915 0

c  -1-1 --> -2
c    ( b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧  b^{258, 1}_0 ∧ -p_258) -> ( b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0)
c  in CNF:
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨  b^{258, 2}_2
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨  b^{258, 2}_1
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨  p_258 ∨ -b^{258, 2}_0
c  in DIMACS:
-22910  22911 -22912  258  22913 0
-22910  22911 -22912  258  22914 0
-22910  22911 -22912  258 -22915 0

c  -2-1 --> break 
c    ( b^{258, 1}_2 ∧  b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧ -p_258) -> break
c  in CNF:
c    -b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨  b^{258, 1}_0 ∨  p_258 ∨ break
c  in DIMACS:
-22910 -22911  22912  258 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{258, 1}_2 ∧ -b^{258, 1}_1 ∧ -b^{258, 1}_0 ∧ true) 
c  in CNF:
c    -b^{258, 1}_2 ∨  b^{258, 1}_1 ∨  b^{258, 1}_0 ∨ false 
c  in DIMACS:
-22910  22911  22912  0

c  3 does not represent an automaton state.
c    -(-b^{258, 1}_2 ∧  b^{258, 1}_1 ∧  b^{258, 1}_0 ∧ true) 
c  in CNF:
c     b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ false 
c  in DIMACS:
 22910 -22911 -22912  0
c  -3 does not represent an automaton state.
c    -( b^{258, 1}_2 ∧  b^{258, 1}_1 ∧  b^{258, 1}_0 ∧ true) 
c  in CNF:
c    -b^{258, 1}_2 ∨ -b^{258, 1}_1 ∨ -b^{258, 1}_0 ∨ false 
c  in DIMACS:
-22910 -22911 -22912  0

c i = 2
c  -2+1 --> -1
c    ( b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧  p_516) -> ( b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0)
c  in CNF:
c    -b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨  b^{258, 3}_2
c    -b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_1
c    -b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨  b^{258, 3}_0
c  in DIMACS:
-22913 -22914  22915 -516  22916 0
-22913 -22914  22915 -516 -22917 0
-22913 -22914  22915 -516  22918 0

c  -1+1 --> 0
c    ( b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0 ∧  p_516) -> (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧ -b^{258, 3}_0)
c  in CNF:
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_2
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_1
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_0
c  in DIMACS:
-22913  22914 -22915 -516 -22916 0
-22913  22914 -22915 -516 -22917 0
-22913  22914 -22915 -516 -22918 0

c  0+1 --> 1
c    (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧  p_516) -> (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0)
c  in CNF:
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_2
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_1
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨  b^{258, 3}_0
c  in DIMACS:
 22913  22914  22915 -516 -22916 0
 22913  22914  22915 -516 -22917 0
 22913  22914  22915 -516  22918 0

c  1+1 --> 2
c    (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0 ∧  p_516) -> (-b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0)
c  in CNF:
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_2
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨  b^{258, 3}_1
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ -p_516 ∨ -b^{258, 3}_0
c  in DIMACS:
 22913  22914 -22915 -516 -22916 0
 22913  22914 -22915 -516  22917 0
 22913  22914 -22915 -516 -22918 0

c  2+1 --> break 
c    (-b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧  p_516) -> break
c  in CNF:
c     b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ -p_516 ∨ break
c  in DIMACS:
 22913 -22914  22915 -516 1162 0


c  2-1 --> 1
c    (-b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧ -p_516) -> (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0)
c  in CNF:
c     b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_2
c     b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_1
c     b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨  b^{258, 3}_0
c  in DIMACS:
 22913 -22914  22915  516 -22916 0
 22913 -22914  22915  516 -22917 0
 22913 -22914  22915  516  22918 0

c  1-1 --> 0
c    (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0 ∧ -p_516) -> (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧ -b^{258, 3}_0)
c  in CNF:
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_2
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_1
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_0
c  in DIMACS:
 22913  22914 -22915  516 -22916 0
 22913  22914 -22915  516 -22917 0
 22913  22914 -22915  516 -22918 0

c  0-1 --> -1
c    (-b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧ -p_516) -> ( b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0)
c  in CNF:
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨  b^{258, 3}_2
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_1
c     b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨  b^{258, 3}_0
c  in DIMACS:
 22913  22914  22915  516  22916 0
 22913  22914  22915  516 -22917 0
 22913  22914  22915  516  22918 0

c  -1-1 --> -2
c    ( b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧  b^{258, 2}_0 ∧ -p_516) -> ( b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0)
c  in CNF:
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨  b^{258, 3}_2
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨  b^{258, 3}_1
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨  p_516 ∨ -b^{258, 3}_0
c  in DIMACS:
-22913  22914 -22915  516  22916 0
-22913  22914 -22915  516  22917 0
-22913  22914 -22915  516 -22918 0

c  -2-1 --> break 
c    ( b^{258, 2}_2 ∧  b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧ -p_516) -> break
c  in CNF:
c    -b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨  b^{258, 2}_0 ∨  p_516 ∨ break
c  in DIMACS:
-22913 -22914  22915  516 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{258, 2}_2 ∧ -b^{258, 2}_1 ∧ -b^{258, 2}_0 ∧ true) 
c  in CNF:
c    -b^{258, 2}_2 ∨  b^{258, 2}_1 ∨  b^{258, 2}_0 ∨ false 
c  in DIMACS:
-22913  22914  22915  0

c  3 does not represent an automaton state.
c    -(-b^{258, 2}_2 ∧  b^{258, 2}_1 ∧  b^{258, 2}_0 ∧ true) 
c  in CNF:
c     b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ false 
c  in DIMACS:
 22913 -22914 -22915  0
c  -3 does not represent an automaton state.
c    -( b^{258, 2}_2 ∧  b^{258, 2}_1 ∧  b^{258, 2}_0 ∧ true) 
c  in CNF:
c    -b^{258, 2}_2 ∨ -b^{258, 2}_1 ∨ -b^{258, 2}_0 ∨ false 
c  in DIMACS:
-22913 -22914 -22915  0

c i = 3
c  -2+1 --> -1
c    ( b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧  p_774) -> ( b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0)
c  in CNF:
c    -b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨  b^{258, 4}_2
c    -b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_1
c    -b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨  b^{258, 4}_0
c  in DIMACS:
-22916 -22917  22918 -774  22919 0
-22916 -22917  22918 -774 -22920 0
-22916 -22917  22918 -774  22921 0

c  -1+1 --> 0
c    ( b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0 ∧  p_774) -> (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧ -b^{258, 4}_0)
c  in CNF:
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_2
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_1
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_0
c  in DIMACS:
-22916  22917 -22918 -774 -22919 0
-22916  22917 -22918 -774 -22920 0
-22916  22917 -22918 -774 -22921 0

c  0+1 --> 1
c    (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧  p_774) -> (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0)
c  in CNF:
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_2
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_1
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨  b^{258, 4}_0
c  in DIMACS:
 22916  22917  22918 -774 -22919 0
 22916  22917  22918 -774 -22920 0
 22916  22917  22918 -774  22921 0

c  1+1 --> 2
c    (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0 ∧  p_774) -> (-b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0)
c  in CNF:
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_2
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨  b^{258, 4}_1
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ -p_774 ∨ -b^{258, 4}_0
c  in DIMACS:
 22916  22917 -22918 -774 -22919 0
 22916  22917 -22918 -774  22920 0
 22916  22917 -22918 -774 -22921 0

c  2+1 --> break 
c    (-b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧  p_774) -> break
c  in CNF:
c     b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 22916 -22917  22918 -774 1162 0


c  2-1 --> 1
c    (-b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧ -p_774) -> (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0)
c  in CNF:
c     b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_2
c     b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_1
c     b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨  b^{258, 4}_0
c  in DIMACS:
 22916 -22917  22918  774 -22919 0
 22916 -22917  22918  774 -22920 0
 22916 -22917  22918  774  22921 0

c  1-1 --> 0
c    (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0 ∧ -p_774) -> (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧ -b^{258, 4}_0)
c  in CNF:
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_2
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_1
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_0
c  in DIMACS:
 22916  22917 -22918  774 -22919 0
 22916  22917 -22918  774 -22920 0
 22916  22917 -22918  774 -22921 0

c  0-1 --> -1
c    (-b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧ -p_774) -> ( b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0)
c  in CNF:
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨  b^{258, 4}_2
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_1
c     b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨  b^{258, 4}_0
c  in DIMACS:
 22916  22917  22918  774  22919 0
 22916  22917  22918  774 -22920 0
 22916  22917  22918  774  22921 0

c  -1-1 --> -2
c    ( b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧  b^{258, 3}_0 ∧ -p_774) -> ( b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0)
c  in CNF:
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨  b^{258, 4}_2
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨  b^{258, 4}_1
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨  p_774 ∨ -b^{258, 4}_0
c  in DIMACS:
-22916  22917 -22918  774  22919 0
-22916  22917 -22918  774  22920 0
-22916  22917 -22918  774 -22921 0

c  -2-1 --> break 
c    ( b^{258, 3}_2 ∧  b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨  b^{258, 3}_0 ∨  p_774 ∨ break
c  in DIMACS:
-22916 -22917  22918  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{258, 3}_2 ∧ -b^{258, 3}_1 ∧ -b^{258, 3}_0 ∧ true) 
c  in CNF:
c    -b^{258, 3}_2 ∨  b^{258, 3}_1 ∨  b^{258, 3}_0 ∨ false 
c  in DIMACS:
-22916  22917  22918  0

c  3 does not represent an automaton state.
c    -(-b^{258, 3}_2 ∧  b^{258, 3}_1 ∧  b^{258, 3}_0 ∧ true) 
c  in CNF:
c     b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ false 
c  in DIMACS:
 22916 -22917 -22918  0
c  -3 does not represent an automaton state.
c    -( b^{258, 3}_2 ∧  b^{258, 3}_1 ∧  b^{258, 3}_0 ∧ true) 
c  in CNF:
c    -b^{258, 3}_2 ∨ -b^{258, 3}_1 ∨ -b^{258, 3}_0 ∨ false 
c  in DIMACS:
-22916 -22917 -22918  0

c i = 4
c  -2+1 --> -1
c    ( b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧  p_1032) -> ( b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧  b^{258, 5}_0)
c  in CNF:
c    -b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨  b^{258, 5}_2
c    -b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_1
c    -b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨  b^{258, 5}_0
c  in DIMACS:
-22919 -22920  22921 -1032  22922 0
-22919 -22920  22921 -1032 -22923 0
-22919 -22920  22921 -1032  22924 0

c  -1+1 --> 0
c    ( b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0 ∧  p_1032) -> (-b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧ -b^{258, 5}_0)
c  in CNF:
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_2
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_1
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_0
c  in DIMACS:
-22919  22920 -22921 -1032 -22922 0
-22919  22920 -22921 -1032 -22923 0
-22919  22920 -22921 -1032 -22924 0

c  0+1 --> 1
c    (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧  p_1032) -> (-b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧  b^{258, 5}_0)
c  in CNF:
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_2
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_1
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨  b^{258, 5}_0
c  in DIMACS:
 22919  22920  22921 -1032 -22922 0
 22919  22920  22921 -1032 -22923 0
 22919  22920  22921 -1032  22924 0

c  1+1 --> 2
c    (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0 ∧  p_1032) -> (-b^{258, 5}_2 ∧  b^{258, 5}_1 ∧ -b^{258, 5}_0)
c  in CNF:
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_2
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨  b^{258, 5}_1
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ -p_1032 ∨ -b^{258, 5}_0
c  in DIMACS:
 22919  22920 -22921 -1032 -22922 0
 22919  22920 -22921 -1032  22923 0
 22919  22920 -22921 -1032 -22924 0

c  2+1 --> break 
c    (-b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 22919 -22920  22921 -1032 1162 0


c  2-1 --> 1
c    (-b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧ -p_1032) -> (-b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧  b^{258, 5}_0)
c  in CNF:
c     b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_2
c     b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_1
c     b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨  b^{258, 5}_0
c  in DIMACS:
 22919 -22920  22921  1032 -22922 0
 22919 -22920  22921  1032 -22923 0
 22919 -22920  22921  1032  22924 0

c  1-1 --> 0
c    (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0 ∧ -p_1032) -> (-b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧ -b^{258, 5}_0)
c  in CNF:
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_2
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_1
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_0
c  in DIMACS:
 22919  22920 -22921  1032 -22922 0
 22919  22920 -22921  1032 -22923 0
 22919  22920 -22921  1032 -22924 0

c  0-1 --> -1
c    (-b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧ -p_1032) -> ( b^{258, 5}_2 ∧ -b^{258, 5}_1 ∧  b^{258, 5}_0)
c  in CNF:
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨  b^{258, 5}_2
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_1
c     b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨  b^{258, 5}_0
c  in DIMACS:
 22919  22920  22921  1032  22922 0
 22919  22920  22921  1032 -22923 0
 22919  22920  22921  1032  22924 0

c  -1-1 --> -2
c    ( b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧  b^{258, 4}_0 ∧ -p_1032) -> ( b^{258, 5}_2 ∧  b^{258, 5}_1 ∧ -b^{258, 5}_0)
c  in CNF:
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨  b^{258, 5}_2
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨  b^{258, 5}_1
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨  p_1032 ∨ -b^{258, 5}_0
c  in DIMACS:
-22919  22920 -22921  1032  22922 0
-22919  22920 -22921  1032  22923 0
-22919  22920 -22921  1032 -22924 0

c  -2-1 --> break 
c    ( b^{258, 4}_2 ∧  b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨  b^{258, 4}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-22919 -22920  22921  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{258, 4}_2 ∧ -b^{258, 4}_1 ∧ -b^{258, 4}_0 ∧ true) 
c  in CNF:
c    -b^{258, 4}_2 ∨  b^{258, 4}_1 ∨  b^{258, 4}_0 ∨ false 
c  in DIMACS:
-22919  22920  22921  0

c  3 does not represent an automaton state.
c    -(-b^{258, 4}_2 ∧  b^{258, 4}_1 ∧  b^{258, 4}_0 ∧ true) 
c  in CNF:
c     b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ false 
c  in DIMACS:
 22919 -22920 -22921  0
c  -3 does not represent an automaton state.
c    -( b^{258, 4}_2 ∧  b^{258, 4}_1 ∧  b^{258, 4}_0 ∧ true) 
c  in CNF:
c    -b^{258, 4}_2 ∨ -b^{258, 4}_1 ∨ -b^{258, 4}_0 ∨ false 
c  in DIMACS:
-22919 -22920 -22921  0

c INIT for k = 259
c    -b^{259, 1}_2
c    -b^{259, 1}_1
c    -b^{259, 1}_0
c  in DIMACS:
-22925 0
-22926 0
-22927 0

c Transitions for k = 259
c i = 1
c  -2+1 --> -1
c    ( b^{259, 1}_2 ∧  b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧  p_259) -> ( b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0)
c  in CNF:
c    -b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨  b^{259, 2}_2
c    -b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_1
c    -b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨  b^{259, 2}_0
c  in DIMACS:
-22925 -22926  22927 -259  22928 0
-22925 -22926  22927 -259 -22929 0
-22925 -22926  22927 -259  22930 0

c  -1+1 --> 0
c    ( b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧  b^{259, 1}_0 ∧  p_259) -> (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧ -b^{259, 2}_0)
c  in CNF:
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_2
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_1
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_0
c  in DIMACS:
-22925  22926 -22927 -259 -22928 0
-22925  22926 -22927 -259 -22929 0
-22925  22926 -22927 -259 -22930 0

c  0+1 --> 1
c    (-b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧  p_259) -> (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0)
c  in CNF:
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_2
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_1
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨  b^{259, 2}_0
c  in DIMACS:
 22925  22926  22927 -259 -22928 0
 22925  22926  22927 -259 -22929 0
 22925  22926  22927 -259  22930 0

c  1+1 --> 2
c    (-b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧  b^{259, 1}_0 ∧  p_259) -> (-b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0)
c  in CNF:
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_2
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨  b^{259, 2}_1
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ -p_259 ∨ -b^{259, 2}_0
c  in DIMACS:
 22925  22926 -22927 -259 -22928 0
 22925  22926 -22927 -259  22929 0
 22925  22926 -22927 -259 -22930 0

c  2+1 --> break 
c    (-b^{259, 1}_2 ∧  b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧  p_259) -> break
c  in CNF:
c     b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ -p_259 ∨ break
c  in DIMACS:
 22925 -22926  22927 -259 1162 0


c  2-1 --> 1
c    (-b^{259, 1}_2 ∧  b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧ -p_259) -> (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0)
c  in CNF:
c     b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_2
c     b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_1
c     b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨  b^{259, 2}_0
c  in DIMACS:
 22925 -22926  22927  259 -22928 0
 22925 -22926  22927  259 -22929 0
 22925 -22926  22927  259  22930 0

c  1-1 --> 0
c    (-b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧  b^{259, 1}_0 ∧ -p_259) -> (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧ -b^{259, 2}_0)
c  in CNF:
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_2
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_1
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_0
c  in DIMACS:
 22925  22926 -22927  259 -22928 0
 22925  22926 -22927  259 -22929 0
 22925  22926 -22927  259 -22930 0

c  0-1 --> -1
c    (-b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧ -p_259) -> ( b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0)
c  in CNF:
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨  b^{259, 2}_2
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_1
c     b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨  b^{259, 2}_0
c  in DIMACS:
 22925  22926  22927  259  22928 0
 22925  22926  22927  259 -22929 0
 22925  22926  22927  259  22930 0

c  -1-1 --> -2
c    ( b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧  b^{259, 1}_0 ∧ -p_259) -> ( b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0)
c  in CNF:
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨  b^{259, 2}_2
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨  b^{259, 2}_1
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨  p_259 ∨ -b^{259, 2}_0
c  in DIMACS:
-22925  22926 -22927  259  22928 0
-22925  22926 -22927  259  22929 0
-22925  22926 -22927  259 -22930 0

c  -2-1 --> break 
c    ( b^{259, 1}_2 ∧  b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧ -p_259) -> break
c  in CNF:
c    -b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨  b^{259, 1}_0 ∨  p_259 ∨ break
c  in DIMACS:
-22925 -22926  22927  259 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{259, 1}_2 ∧ -b^{259, 1}_1 ∧ -b^{259, 1}_0 ∧ true) 
c  in CNF:
c    -b^{259, 1}_2 ∨  b^{259, 1}_1 ∨  b^{259, 1}_0 ∨ false 
c  in DIMACS:
-22925  22926  22927  0

c  3 does not represent an automaton state.
c    -(-b^{259, 1}_2 ∧  b^{259, 1}_1 ∧  b^{259, 1}_0 ∧ true) 
c  in CNF:
c     b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ false 
c  in DIMACS:
 22925 -22926 -22927  0
c  -3 does not represent an automaton state.
c    -( b^{259, 1}_2 ∧  b^{259, 1}_1 ∧  b^{259, 1}_0 ∧ true) 
c  in CNF:
c    -b^{259, 1}_2 ∨ -b^{259, 1}_1 ∨ -b^{259, 1}_0 ∨ false 
c  in DIMACS:
-22925 -22926 -22927  0

c i = 2
c  -2+1 --> -1
c    ( b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧  p_518) -> ( b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0)
c  in CNF:
c    -b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨  b^{259, 3}_2
c    -b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_1
c    -b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨  b^{259, 3}_0
c  in DIMACS:
-22928 -22929  22930 -518  22931 0
-22928 -22929  22930 -518 -22932 0
-22928 -22929  22930 -518  22933 0

c  -1+1 --> 0
c    ( b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0 ∧  p_518) -> (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧ -b^{259, 3}_0)
c  in CNF:
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_2
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_1
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_0
c  in DIMACS:
-22928  22929 -22930 -518 -22931 0
-22928  22929 -22930 -518 -22932 0
-22928  22929 -22930 -518 -22933 0

c  0+1 --> 1
c    (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧  p_518) -> (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0)
c  in CNF:
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_2
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_1
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨  b^{259, 3}_0
c  in DIMACS:
 22928  22929  22930 -518 -22931 0
 22928  22929  22930 -518 -22932 0
 22928  22929  22930 -518  22933 0

c  1+1 --> 2
c    (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0 ∧  p_518) -> (-b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0)
c  in CNF:
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_2
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨  b^{259, 3}_1
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ -p_518 ∨ -b^{259, 3}_0
c  in DIMACS:
 22928  22929 -22930 -518 -22931 0
 22928  22929 -22930 -518  22932 0
 22928  22929 -22930 -518 -22933 0

c  2+1 --> break 
c    (-b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧  p_518) -> break
c  in CNF:
c     b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ -p_518 ∨ break
c  in DIMACS:
 22928 -22929  22930 -518 1162 0


c  2-1 --> 1
c    (-b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧ -p_518) -> (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0)
c  in CNF:
c     b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_2
c     b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_1
c     b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨  b^{259, 3}_0
c  in DIMACS:
 22928 -22929  22930  518 -22931 0
 22928 -22929  22930  518 -22932 0
 22928 -22929  22930  518  22933 0

c  1-1 --> 0
c    (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0 ∧ -p_518) -> (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧ -b^{259, 3}_0)
c  in CNF:
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_2
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_1
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_0
c  in DIMACS:
 22928  22929 -22930  518 -22931 0
 22928  22929 -22930  518 -22932 0
 22928  22929 -22930  518 -22933 0

c  0-1 --> -1
c    (-b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧ -p_518) -> ( b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0)
c  in CNF:
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨  b^{259, 3}_2
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_1
c     b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨  b^{259, 3}_0
c  in DIMACS:
 22928  22929  22930  518  22931 0
 22928  22929  22930  518 -22932 0
 22928  22929  22930  518  22933 0

c  -1-1 --> -2
c    ( b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧  b^{259, 2}_0 ∧ -p_518) -> ( b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0)
c  in CNF:
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨  b^{259, 3}_2
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨  b^{259, 3}_1
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨  p_518 ∨ -b^{259, 3}_0
c  in DIMACS:
-22928  22929 -22930  518  22931 0
-22928  22929 -22930  518  22932 0
-22928  22929 -22930  518 -22933 0

c  -2-1 --> break 
c    ( b^{259, 2}_2 ∧  b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧ -p_518) -> break
c  in CNF:
c    -b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨  b^{259, 2}_0 ∨  p_518 ∨ break
c  in DIMACS:
-22928 -22929  22930  518 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{259, 2}_2 ∧ -b^{259, 2}_1 ∧ -b^{259, 2}_0 ∧ true) 
c  in CNF:
c    -b^{259, 2}_2 ∨  b^{259, 2}_1 ∨  b^{259, 2}_0 ∨ false 
c  in DIMACS:
-22928  22929  22930  0

c  3 does not represent an automaton state.
c    -(-b^{259, 2}_2 ∧  b^{259, 2}_1 ∧  b^{259, 2}_0 ∧ true) 
c  in CNF:
c     b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ false 
c  in DIMACS:
 22928 -22929 -22930  0
c  -3 does not represent an automaton state.
c    -( b^{259, 2}_2 ∧  b^{259, 2}_1 ∧  b^{259, 2}_0 ∧ true) 
c  in CNF:
c    -b^{259, 2}_2 ∨ -b^{259, 2}_1 ∨ -b^{259, 2}_0 ∨ false 
c  in DIMACS:
-22928 -22929 -22930  0

c i = 3
c  -2+1 --> -1
c    ( b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧  p_777) -> ( b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0)
c  in CNF:
c    -b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨  b^{259, 4}_2
c    -b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_1
c    -b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨  b^{259, 4}_0
c  in DIMACS:
-22931 -22932  22933 -777  22934 0
-22931 -22932  22933 -777 -22935 0
-22931 -22932  22933 -777  22936 0

c  -1+1 --> 0
c    ( b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0 ∧  p_777) -> (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧ -b^{259, 4}_0)
c  in CNF:
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_2
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_1
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_0
c  in DIMACS:
-22931  22932 -22933 -777 -22934 0
-22931  22932 -22933 -777 -22935 0
-22931  22932 -22933 -777 -22936 0

c  0+1 --> 1
c    (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧  p_777) -> (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0)
c  in CNF:
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_2
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_1
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨  b^{259, 4}_0
c  in DIMACS:
 22931  22932  22933 -777 -22934 0
 22931  22932  22933 -777 -22935 0
 22931  22932  22933 -777  22936 0

c  1+1 --> 2
c    (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0 ∧  p_777) -> (-b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0)
c  in CNF:
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_2
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨  b^{259, 4}_1
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ -p_777 ∨ -b^{259, 4}_0
c  in DIMACS:
 22931  22932 -22933 -777 -22934 0
 22931  22932 -22933 -777  22935 0
 22931  22932 -22933 -777 -22936 0

c  2+1 --> break 
c    (-b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧  p_777) -> break
c  in CNF:
c     b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ -p_777 ∨ break
c  in DIMACS:
 22931 -22932  22933 -777 1162 0


c  2-1 --> 1
c    (-b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧ -p_777) -> (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0)
c  in CNF:
c     b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_2
c     b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_1
c     b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨  b^{259, 4}_0
c  in DIMACS:
 22931 -22932  22933  777 -22934 0
 22931 -22932  22933  777 -22935 0
 22931 -22932  22933  777  22936 0

c  1-1 --> 0
c    (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0 ∧ -p_777) -> (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧ -b^{259, 4}_0)
c  in CNF:
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_2
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_1
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_0
c  in DIMACS:
 22931  22932 -22933  777 -22934 0
 22931  22932 -22933  777 -22935 0
 22931  22932 -22933  777 -22936 0

c  0-1 --> -1
c    (-b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧ -p_777) -> ( b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0)
c  in CNF:
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨  b^{259, 4}_2
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_1
c     b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨  b^{259, 4}_0
c  in DIMACS:
 22931  22932  22933  777  22934 0
 22931  22932  22933  777 -22935 0
 22931  22932  22933  777  22936 0

c  -1-1 --> -2
c    ( b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧  b^{259, 3}_0 ∧ -p_777) -> ( b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0)
c  in CNF:
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨  b^{259, 4}_2
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨  b^{259, 4}_1
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨  p_777 ∨ -b^{259, 4}_0
c  in DIMACS:
-22931  22932 -22933  777  22934 0
-22931  22932 -22933  777  22935 0
-22931  22932 -22933  777 -22936 0

c  -2-1 --> break 
c    ( b^{259, 3}_2 ∧  b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧ -p_777) -> break
c  in CNF:
c    -b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨  b^{259, 3}_0 ∨  p_777 ∨ break
c  in DIMACS:
-22931 -22932  22933  777 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{259, 3}_2 ∧ -b^{259, 3}_1 ∧ -b^{259, 3}_0 ∧ true) 
c  in CNF:
c    -b^{259, 3}_2 ∨  b^{259, 3}_1 ∨  b^{259, 3}_0 ∨ false 
c  in DIMACS:
-22931  22932  22933  0

c  3 does not represent an automaton state.
c    -(-b^{259, 3}_2 ∧  b^{259, 3}_1 ∧  b^{259, 3}_0 ∧ true) 
c  in CNF:
c     b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ false 
c  in DIMACS:
 22931 -22932 -22933  0
c  -3 does not represent an automaton state.
c    -( b^{259, 3}_2 ∧  b^{259, 3}_1 ∧  b^{259, 3}_0 ∧ true) 
c  in CNF:
c    -b^{259, 3}_2 ∨ -b^{259, 3}_1 ∨ -b^{259, 3}_0 ∨ false 
c  in DIMACS:
-22931 -22932 -22933  0

c i = 4
c  -2+1 --> -1
c    ( b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧  p_1036) -> ( b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧  b^{259, 5}_0)
c  in CNF:
c    -b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨  b^{259, 5}_2
c    -b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_1
c    -b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨  b^{259, 5}_0
c  in DIMACS:
-22934 -22935  22936 -1036  22937 0
-22934 -22935  22936 -1036 -22938 0
-22934 -22935  22936 -1036  22939 0

c  -1+1 --> 0
c    ( b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0 ∧  p_1036) -> (-b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧ -b^{259, 5}_0)
c  in CNF:
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_2
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_1
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_0
c  in DIMACS:
-22934  22935 -22936 -1036 -22937 0
-22934  22935 -22936 -1036 -22938 0
-22934  22935 -22936 -1036 -22939 0

c  0+1 --> 1
c    (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧  p_1036) -> (-b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧  b^{259, 5}_0)
c  in CNF:
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_2
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_1
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨  b^{259, 5}_0
c  in DIMACS:
 22934  22935  22936 -1036 -22937 0
 22934  22935  22936 -1036 -22938 0
 22934  22935  22936 -1036  22939 0

c  1+1 --> 2
c    (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0 ∧  p_1036) -> (-b^{259, 5}_2 ∧  b^{259, 5}_1 ∧ -b^{259, 5}_0)
c  in CNF:
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_2
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨  b^{259, 5}_1
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ -p_1036 ∨ -b^{259, 5}_0
c  in DIMACS:
 22934  22935 -22936 -1036 -22937 0
 22934  22935 -22936 -1036  22938 0
 22934  22935 -22936 -1036 -22939 0

c  2+1 --> break 
c    (-b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧  p_1036) -> break
c  in CNF:
c     b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ -p_1036 ∨ break
c  in DIMACS:
 22934 -22935  22936 -1036 1162 0


c  2-1 --> 1
c    (-b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧ -p_1036) -> (-b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧  b^{259, 5}_0)
c  in CNF:
c     b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_2
c     b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_1
c     b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨  b^{259, 5}_0
c  in DIMACS:
 22934 -22935  22936  1036 -22937 0
 22934 -22935  22936  1036 -22938 0
 22934 -22935  22936  1036  22939 0

c  1-1 --> 0
c    (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0 ∧ -p_1036) -> (-b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧ -b^{259, 5}_0)
c  in CNF:
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_2
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_1
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_0
c  in DIMACS:
 22934  22935 -22936  1036 -22937 0
 22934  22935 -22936  1036 -22938 0
 22934  22935 -22936  1036 -22939 0

c  0-1 --> -1
c    (-b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧ -p_1036) -> ( b^{259, 5}_2 ∧ -b^{259, 5}_1 ∧  b^{259, 5}_0)
c  in CNF:
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨  b^{259, 5}_2
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_1
c     b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨  b^{259, 5}_0
c  in DIMACS:
 22934  22935  22936  1036  22937 0
 22934  22935  22936  1036 -22938 0
 22934  22935  22936  1036  22939 0

c  -1-1 --> -2
c    ( b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧  b^{259, 4}_0 ∧ -p_1036) -> ( b^{259, 5}_2 ∧  b^{259, 5}_1 ∧ -b^{259, 5}_0)
c  in CNF:
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨  b^{259, 5}_2
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨  b^{259, 5}_1
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨  p_1036 ∨ -b^{259, 5}_0
c  in DIMACS:
-22934  22935 -22936  1036  22937 0
-22934  22935 -22936  1036  22938 0
-22934  22935 -22936  1036 -22939 0

c  -2-1 --> break 
c    ( b^{259, 4}_2 ∧  b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧ -p_1036) -> break
c  in CNF:
c    -b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨  b^{259, 4}_0 ∨  p_1036 ∨ break
c  in DIMACS:
-22934 -22935  22936  1036 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{259, 4}_2 ∧ -b^{259, 4}_1 ∧ -b^{259, 4}_0 ∧ true) 
c  in CNF:
c    -b^{259, 4}_2 ∨  b^{259, 4}_1 ∨  b^{259, 4}_0 ∨ false 
c  in DIMACS:
-22934  22935  22936  0

c  3 does not represent an automaton state.
c    -(-b^{259, 4}_2 ∧  b^{259, 4}_1 ∧  b^{259, 4}_0 ∧ true) 
c  in CNF:
c     b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ false 
c  in DIMACS:
 22934 -22935 -22936  0
c  -3 does not represent an automaton state.
c    -( b^{259, 4}_2 ∧  b^{259, 4}_1 ∧  b^{259, 4}_0 ∧ true) 
c  in CNF:
c    -b^{259, 4}_2 ∨ -b^{259, 4}_1 ∨ -b^{259, 4}_0 ∨ false 
c  in DIMACS:
-22934 -22935 -22936  0

c INIT for k = 260
c    -b^{260, 1}_2
c    -b^{260, 1}_1
c    -b^{260, 1}_0
c  in DIMACS:
-22940 0
-22941 0
-22942 0

c Transitions for k = 260
c i = 1
c  -2+1 --> -1
c    ( b^{260, 1}_2 ∧  b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧  p_260) -> ( b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0)
c  in CNF:
c    -b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨  b^{260, 2}_2
c    -b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_1
c    -b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨  b^{260, 2}_0
c  in DIMACS:
-22940 -22941  22942 -260  22943 0
-22940 -22941  22942 -260 -22944 0
-22940 -22941  22942 -260  22945 0

c  -1+1 --> 0
c    ( b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧  b^{260, 1}_0 ∧  p_260) -> (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧ -b^{260, 2}_0)
c  in CNF:
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_2
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_1
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_0
c  in DIMACS:
-22940  22941 -22942 -260 -22943 0
-22940  22941 -22942 -260 -22944 0
-22940  22941 -22942 -260 -22945 0

c  0+1 --> 1
c    (-b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧  p_260) -> (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0)
c  in CNF:
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_2
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_1
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨  b^{260, 2}_0
c  in DIMACS:
 22940  22941  22942 -260 -22943 0
 22940  22941  22942 -260 -22944 0
 22940  22941  22942 -260  22945 0

c  1+1 --> 2
c    (-b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧  b^{260, 1}_0 ∧  p_260) -> (-b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0)
c  in CNF:
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_2
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨  b^{260, 2}_1
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ -p_260 ∨ -b^{260, 2}_0
c  in DIMACS:
 22940  22941 -22942 -260 -22943 0
 22940  22941 -22942 -260  22944 0
 22940  22941 -22942 -260 -22945 0

c  2+1 --> break 
c    (-b^{260, 1}_2 ∧  b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧  p_260) -> break
c  in CNF:
c     b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ -p_260 ∨ break
c  in DIMACS:
 22940 -22941  22942 -260 1162 0


c  2-1 --> 1
c    (-b^{260, 1}_2 ∧  b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧ -p_260) -> (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0)
c  in CNF:
c     b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_2
c     b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_1
c     b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨  b^{260, 2}_0
c  in DIMACS:
 22940 -22941  22942  260 -22943 0
 22940 -22941  22942  260 -22944 0
 22940 -22941  22942  260  22945 0

c  1-1 --> 0
c    (-b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧  b^{260, 1}_0 ∧ -p_260) -> (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧ -b^{260, 2}_0)
c  in CNF:
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_2
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_1
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_0
c  in DIMACS:
 22940  22941 -22942  260 -22943 0
 22940  22941 -22942  260 -22944 0
 22940  22941 -22942  260 -22945 0

c  0-1 --> -1
c    (-b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧ -p_260) -> ( b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0)
c  in CNF:
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨  b^{260, 2}_2
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_1
c     b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨  b^{260, 2}_0
c  in DIMACS:
 22940  22941  22942  260  22943 0
 22940  22941  22942  260 -22944 0
 22940  22941  22942  260  22945 0

c  -1-1 --> -2
c    ( b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧  b^{260, 1}_0 ∧ -p_260) -> ( b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0)
c  in CNF:
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨  b^{260, 2}_2
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨  b^{260, 2}_1
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨  p_260 ∨ -b^{260, 2}_0
c  in DIMACS:
-22940  22941 -22942  260  22943 0
-22940  22941 -22942  260  22944 0
-22940  22941 -22942  260 -22945 0

c  -2-1 --> break 
c    ( b^{260, 1}_2 ∧  b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧ -p_260) -> break
c  in CNF:
c    -b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨  b^{260, 1}_0 ∨  p_260 ∨ break
c  in DIMACS:
-22940 -22941  22942  260 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{260, 1}_2 ∧ -b^{260, 1}_1 ∧ -b^{260, 1}_0 ∧ true) 
c  in CNF:
c    -b^{260, 1}_2 ∨  b^{260, 1}_1 ∨  b^{260, 1}_0 ∨ false 
c  in DIMACS:
-22940  22941  22942  0

c  3 does not represent an automaton state.
c    -(-b^{260, 1}_2 ∧  b^{260, 1}_1 ∧  b^{260, 1}_0 ∧ true) 
c  in CNF:
c     b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ false 
c  in DIMACS:
 22940 -22941 -22942  0
c  -3 does not represent an automaton state.
c    -( b^{260, 1}_2 ∧  b^{260, 1}_1 ∧  b^{260, 1}_0 ∧ true) 
c  in CNF:
c    -b^{260, 1}_2 ∨ -b^{260, 1}_1 ∨ -b^{260, 1}_0 ∨ false 
c  in DIMACS:
-22940 -22941 -22942  0

c i = 2
c  -2+1 --> -1
c    ( b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧  p_520) -> ( b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0)
c  in CNF:
c    -b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨  b^{260, 3}_2
c    -b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_1
c    -b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨  b^{260, 3}_0
c  in DIMACS:
-22943 -22944  22945 -520  22946 0
-22943 -22944  22945 -520 -22947 0
-22943 -22944  22945 -520  22948 0

c  -1+1 --> 0
c    ( b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0 ∧  p_520) -> (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧ -b^{260, 3}_0)
c  in CNF:
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_2
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_1
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_0
c  in DIMACS:
-22943  22944 -22945 -520 -22946 0
-22943  22944 -22945 -520 -22947 0
-22943  22944 -22945 -520 -22948 0

c  0+1 --> 1
c    (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧  p_520) -> (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0)
c  in CNF:
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_2
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_1
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨  b^{260, 3}_0
c  in DIMACS:
 22943  22944  22945 -520 -22946 0
 22943  22944  22945 -520 -22947 0
 22943  22944  22945 -520  22948 0

c  1+1 --> 2
c    (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0 ∧  p_520) -> (-b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0)
c  in CNF:
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_2
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨  b^{260, 3}_1
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ -p_520 ∨ -b^{260, 3}_0
c  in DIMACS:
 22943  22944 -22945 -520 -22946 0
 22943  22944 -22945 -520  22947 0
 22943  22944 -22945 -520 -22948 0

c  2+1 --> break 
c    (-b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧  p_520) -> break
c  in CNF:
c     b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ -p_520 ∨ break
c  in DIMACS:
 22943 -22944  22945 -520 1162 0


c  2-1 --> 1
c    (-b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧ -p_520) -> (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0)
c  in CNF:
c     b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_2
c     b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_1
c     b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨  b^{260, 3}_0
c  in DIMACS:
 22943 -22944  22945  520 -22946 0
 22943 -22944  22945  520 -22947 0
 22943 -22944  22945  520  22948 0

c  1-1 --> 0
c    (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0 ∧ -p_520) -> (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧ -b^{260, 3}_0)
c  in CNF:
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_2
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_1
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_0
c  in DIMACS:
 22943  22944 -22945  520 -22946 0
 22943  22944 -22945  520 -22947 0
 22943  22944 -22945  520 -22948 0

c  0-1 --> -1
c    (-b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧ -p_520) -> ( b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0)
c  in CNF:
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨  b^{260, 3}_2
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_1
c     b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨  b^{260, 3}_0
c  in DIMACS:
 22943  22944  22945  520  22946 0
 22943  22944  22945  520 -22947 0
 22943  22944  22945  520  22948 0

c  -1-1 --> -2
c    ( b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧  b^{260, 2}_0 ∧ -p_520) -> ( b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0)
c  in CNF:
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨  b^{260, 3}_2
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨  b^{260, 3}_1
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨  p_520 ∨ -b^{260, 3}_0
c  in DIMACS:
-22943  22944 -22945  520  22946 0
-22943  22944 -22945  520  22947 0
-22943  22944 -22945  520 -22948 0

c  -2-1 --> break 
c    ( b^{260, 2}_2 ∧  b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧ -p_520) -> break
c  in CNF:
c    -b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨  b^{260, 2}_0 ∨  p_520 ∨ break
c  in DIMACS:
-22943 -22944  22945  520 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{260, 2}_2 ∧ -b^{260, 2}_1 ∧ -b^{260, 2}_0 ∧ true) 
c  in CNF:
c    -b^{260, 2}_2 ∨  b^{260, 2}_1 ∨  b^{260, 2}_0 ∨ false 
c  in DIMACS:
-22943  22944  22945  0

c  3 does not represent an automaton state.
c    -(-b^{260, 2}_2 ∧  b^{260, 2}_1 ∧  b^{260, 2}_0 ∧ true) 
c  in CNF:
c     b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ false 
c  in DIMACS:
 22943 -22944 -22945  0
c  -3 does not represent an automaton state.
c    -( b^{260, 2}_2 ∧  b^{260, 2}_1 ∧  b^{260, 2}_0 ∧ true) 
c  in CNF:
c    -b^{260, 2}_2 ∨ -b^{260, 2}_1 ∨ -b^{260, 2}_0 ∨ false 
c  in DIMACS:
-22943 -22944 -22945  0

c i = 3
c  -2+1 --> -1
c    ( b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧  p_780) -> ( b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0)
c  in CNF:
c    -b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨  b^{260, 4}_2
c    -b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_1
c    -b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨  b^{260, 4}_0
c  in DIMACS:
-22946 -22947  22948 -780  22949 0
-22946 -22947  22948 -780 -22950 0
-22946 -22947  22948 -780  22951 0

c  -1+1 --> 0
c    ( b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0 ∧  p_780) -> (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧ -b^{260, 4}_0)
c  in CNF:
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_2
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_1
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_0
c  in DIMACS:
-22946  22947 -22948 -780 -22949 0
-22946  22947 -22948 -780 -22950 0
-22946  22947 -22948 -780 -22951 0

c  0+1 --> 1
c    (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧  p_780) -> (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0)
c  in CNF:
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_2
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_1
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨  b^{260, 4}_0
c  in DIMACS:
 22946  22947  22948 -780 -22949 0
 22946  22947  22948 -780 -22950 0
 22946  22947  22948 -780  22951 0

c  1+1 --> 2
c    (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0 ∧  p_780) -> (-b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0)
c  in CNF:
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_2
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨  b^{260, 4}_1
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ -p_780 ∨ -b^{260, 4}_0
c  in DIMACS:
 22946  22947 -22948 -780 -22949 0
 22946  22947 -22948 -780  22950 0
 22946  22947 -22948 -780 -22951 0

c  2+1 --> break 
c    (-b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧  p_780) -> break
c  in CNF:
c     b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ -p_780 ∨ break
c  in DIMACS:
 22946 -22947  22948 -780 1162 0


c  2-1 --> 1
c    (-b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧ -p_780) -> (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0)
c  in CNF:
c     b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_2
c     b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_1
c     b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨  b^{260, 4}_0
c  in DIMACS:
 22946 -22947  22948  780 -22949 0
 22946 -22947  22948  780 -22950 0
 22946 -22947  22948  780  22951 0

c  1-1 --> 0
c    (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0 ∧ -p_780) -> (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧ -b^{260, 4}_0)
c  in CNF:
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_2
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_1
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_0
c  in DIMACS:
 22946  22947 -22948  780 -22949 0
 22946  22947 -22948  780 -22950 0
 22946  22947 -22948  780 -22951 0

c  0-1 --> -1
c    (-b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧ -p_780) -> ( b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0)
c  in CNF:
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨  b^{260, 4}_2
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_1
c     b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨  b^{260, 4}_0
c  in DIMACS:
 22946  22947  22948  780  22949 0
 22946  22947  22948  780 -22950 0
 22946  22947  22948  780  22951 0

c  -1-1 --> -2
c    ( b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧  b^{260, 3}_0 ∧ -p_780) -> ( b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0)
c  in CNF:
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨  b^{260, 4}_2
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨  b^{260, 4}_1
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨  p_780 ∨ -b^{260, 4}_0
c  in DIMACS:
-22946  22947 -22948  780  22949 0
-22946  22947 -22948  780  22950 0
-22946  22947 -22948  780 -22951 0

c  -2-1 --> break 
c    ( b^{260, 3}_2 ∧  b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧ -p_780) -> break
c  in CNF:
c    -b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨  b^{260, 3}_0 ∨  p_780 ∨ break
c  in DIMACS:
-22946 -22947  22948  780 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{260, 3}_2 ∧ -b^{260, 3}_1 ∧ -b^{260, 3}_0 ∧ true) 
c  in CNF:
c    -b^{260, 3}_2 ∨  b^{260, 3}_1 ∨  b^{260, 3}_0 ∨ false 
c  in DIMACS:
-22946  22947  22948  0

c  3 does not represent an automaton state.
c    -(-b^{260, 3}_2 ∧  b^{260, 3}_1 ∧  b^{260, 3}_0 ∧ true) 
c  in CNF:
c     b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ false 
c  in DIMACS:
 22946 -22947 -22948  0
c  -3 does not represent an automaton state.
c    -( b^{260, 3}_2 ∧  b^{260, 3}_1 ∧  b^{260, 3}_0 ∧ true) 
c  in CNF:
c    -b^{260, 3}_2 ∨ -b^{260, 3}_1 ∨ -b^{260, 3}_0 ∨ false 
c  in DIMACS:
-22946 -22947 -22948  0

c i = 4
c  -2+1 --> -1
c    ( b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧  p_1040) -> ( b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧  b^{260, 5}_0)
c  in CNF:
c    -b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨  b^{260, 5}_2
c    -b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_1
c    -b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨  b^{260, 5}_0
c  in DIMACS:
-22949 -22950  22951 -1040  22952 0
-22949 -22950  22951 -1040 -22953 0
-22949 -22950  22951 -1040  22954 0

c  -1+1 --> 0
c    ( b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0 ∧  p_1040) -> (-b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧ -b^{260, 5}_0)
c  in CNF:
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_2
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_1
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_0
c  in DIMACS:
-22949  22950 -22951 -1040 -22952 0
-22949  22950 -22951 -1040 -22953 0
-22949  22950 -22951 -1040 -22954 0

c  0+1 --> 1
c    (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧  p_1040) -> (-b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧  b^{260, 5}_0)
c  in CNF:
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_2
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_1
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨  b^{260, 5}_0
c  in DIMACS:
 22949  22950  22951 -1040 -22952 0
 22949  22950  22951 -1040 -22953 0
 22949  22950  22951 -1040  22954 0

c  1+1 --> 2
c    (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0 ∧  p_1040) -> (-b^{260, 5}_2 ∧  b^{260, 5}_1 ∧ -b^{260, 5}_0)
c  in CNF:
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_2
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨  b^{260, 5}_1
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ -p_1040 ∨ -b^{260, 5}_0
c  in DIMACS:
 22949  22950 -22951 -1040 -22952 0
 22949  22950 -22951 -1040  22953 0
 22949  22950 -22951 -1040 -22954 0

c  2+1 --> break 
c    (-b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧  p_1040) -> break
c  in CNF:
c     b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ -p_1040 ∨ break
c  in DIMACS:
 22949 -22950  22951 -1040 1162 0


c  2-1 --> 1
c    (-b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧ -p_1040) -> (-b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧  b^{260, 5}_0)
c  in CNF:
c     b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_2
c     b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_1
c     b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨  b^{260, 5}_0
c  in DIMACS:
 22949 -22950  22951  1040 -22952 0
 22949 -22950  22951  1040 -22953 0
 22949 -22950  22951  1040  22954 0

c  1-1 --> 0
c    (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0 ∧ -p_1040) -> (-b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧ -b^{260, 5}_0)
c  in CNF:
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_2
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_1
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_0
c  in DIMACS:
 22949  22950 -22951  1040 -22952 0
 22949  22950 -22951  1040 -22953 0
 22949  22950 -22951  1040 -22954 0

c  0-1 --> -1
c    (-b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧ -p_1040) -> ( b^{260, 5}_2 ∧ -b^{260, 5}_1 ∧  b^{260, 5}_0)
c  in CNF:
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨  b^{260, 5}_2
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_1
c     b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨  b^{260, 5}_0
c  in DIMACS:
 22949  22950  22951  1040  22952 0
 22949  22950  22951  1040 -22953 0
 22949  22950  22951  1040  22954 0

c  -1-1 --> -2
c    ( b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧  b^{260, 4}_0 ∧ -p_1040) -> ( b^{260, 5}_2 ∧  b^{260, 5}_1 ∧ -b^{260, 5}_0)
c  in CNF:
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨  b^{260, 5}_2
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨  b^{260, 5}_1
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨  p_1040 ∨ -b^{260, 5}_0
c  in DIMACS:
-22949  22950 -22951  1040  22952 0
-22949  22950 -22951  1040  22953 0
-22949  22950 -22951  1040 -22954 0

c  -2-1 --> break 
c    ( b^{260, 4}_2 ∧  b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧ -p_1040) -> break
c  in CNF:
c    -b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨  b^{260, 4}_0 ∨  p_1040 ∨ break
c  in DIMACS:
-22949 -22950  22951  1040 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{260, 4}_2 ∧ -b^{260, 4}_1 ∧ -b^{260, 4}_0 ∧ true) 
c  in CNF:
c    -b^{260, 4}_2 ∨  b^{260, 4}_1 ∨  b^{260, 4}_0 ∨ false 
c  in DIMACS:
-22949  22950  22951  0

c  3 does not represent an automaton state.
c    -(-b^{260, 4}_2 ∧  b^{260, 4}_1 ∧  b^{260, 4}_0 ∧ true) 
c  in CNF:
c     b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ false 
c  in DIMACS:
 22949 -22950 -22951  0
c  -3 does not represent an automaton state.
c    -( b^{260, 4}_2 ∧  b^{260, 4}_1 ∧  b^{260, 4}_0 ∧ true) 
c  in CNF:
c    -b^{260, 4}_2 ∨ -b^{260, 4}_1 ∨ -b^{260, 4}_0 ∨ false 
c  in DIMACS:
-22949 -22950 -22951  0

c INIT for k = 261
c    -b^{261, 1}_2
c    -b^{261, 1}_1
c    -b^{261, 1}_0
c  in DIMACS:
-22955 0
-22956 0
-22957 0

c Transitions for k = 261
c i = 1
c  -2+1 --> -1
c    ( b^{261, 1}_2 ∧  b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧  p_261) -> ( b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0)
c  in CNF:
c    -b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨  b^{261, 2}_2
c    -b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_1
c    -b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨  b^{261, 2}_0
c  in DIMACS:
-22955 -22956  22957 -261  22958 0
-22955 -22956  22957 -261 -22959 0
-22955 -22956  22957 -261  22960 0

c  -1+1 --> 0
c    ( b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧  b^{261, 1}_0 ∧  p_261) -> (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧ -b^{261, 2}_0)
c  in CNF:
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_2
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_1
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_0
c  in DIMACS:
-22955  22956 -22957 -261 -22958 0
-22955  22956 -22957 -261 -22959 0
-22955  22956 -22957 -261 -22960 0

c  0+1 --> 1
c    (-b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧  p_261) -> (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0)
c  in CNF:
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_2
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_1
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨  b^{261, 2}_0
c  in DIMACS:
 22955  22956  22957 -261 -22958 0
 22955  22956  22957 -261 -22959 0
 22955  22956  22957 -261  22960 0

c  1+1 --> 2
c    (-b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧  b^{261, 1}_0 ∧  p_261) -> (-b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0)
c  in CNF:
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_2
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨  b^{261, 2}_1
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ -p_261 ∨ -b^{261, 2}_0
c  in DIMACS:
 22955  22956 -22957 -261 -22958 0
 22955  22956 -22957 -261  22959 0
 22955  22956 -22957 -261 -22960 0

c  2+1 --> break 
c    (-b^{261, 1}_2 ∧  b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧  p_261) -> break
c  in CNF:
c     b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ -p_261 ∨ break
c  in DIMACS:
 22955 -22956  22957 -261 1162 0


c  2-1 --> 1
c    (-b^{261, 1}_2 ∧  b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧ -p_261) -> (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0)
c  in CNF:
c     b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_2
c     b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_1
c     b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨  b^{261, 2}_0
c  in DIMACS:
 22955 -22956  22957  261 -22958 0
 22955 -22956  22957  261 -22959 0
 22955 -22956  22957  261  22960 0

c  1-1 --> 0
c    (-b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧  b^{261, 1}_0 ∧ -p_261) -> (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧ -b^{261, 2}_0)
c  in CNF:
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_2
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_1
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_0
c  in DIMACS:
 22955  22956 -22957  261 -22958 0
 22955  22956 -22957  261 -22959 0
 22955  22956 -22957  261 -22960 0

c  0-1 --> -1
c    (-b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧ -p_261) -> ( b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0)
c  in CNF:
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨  b^{261, 2}_2
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_1
c     b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨  b^{261, 2}_0
c  in DIMACS:
 22955  22956  22957  261  22958 0
 22955  22956  22957  261 -22959 0
 22955  22956  22957  261  22960 0

c  -1-1 --> -2
c    ( b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧  b^{261, 1}_0 ∧ -p_261) -> ( b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0)
c  in CNF:
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨  b^{261, 2}_2
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨  b^{261, 2}_1
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨  p_261 ∨ -b^{261, 2}_0
c  in DIMACS:
-22955  22956 -22957  261  22958 0
-22955  22956 -22957  261  22959 0
-22955  22956 -22957  261 -22960 0

c  -2-1 --> break 
c    ( b^{261, 1}_2 ∧  b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧ -p_261) -> break
c  in CNF:
c    -b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨  b^{261, 1}_0 ∨  p_261 ∨ break
c  in DIMACS:
-22955 -22956  22957  261 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{261, 1}_2 ∧ -b^{261, 1}_1 ∧ -b^{261, 1}_0 ∧ true) 
c  in CNF:
c    -b^{261, 1}_2 ∨  b^{261, 1}_1 ∨  b^{261, 1}_0 ∨ false 
c  in DIMACS:
-22955  22956  22957  0

c  3 does not represent an automaton state.
c    -(-b^{261, 1}_2 ∧  b^{261, 1}_1 ∧  b^{261, 1}_0 ∧ true) 
c  in CNF:
c     b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ false 
c  in DIMACS:
 22955 -22956 -22957  0
c  -3 does not represent an automaton state.
c    -( b^{261, 1}_2 ∧  b^{261, 1}_1 ∧  b^{261, 1}_0 ∧ true) 
c  in CNF:
c    -b^{261, 1}_2 ∨ -b^{261, 1}_1 ∨ -b^{261, 1}_0 ∨ false 
c  in DIMACS:
-22955 -22956 -22957  0

c i = 2
c  -2+1 --> -1
c    ( b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧  p_522) -> ( b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0)
c  in CNF:
c    -b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨  b^{261, 3}_2
c    -b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_1
c    -b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨  b^{261, 3}_0
c  in DIMACS:
-22958 -22959  22960 -522  22961 0
-22958 -22959  22960 -522 -22962 0
-22958 -22959  22960 -522  22963 0

c  -1+1 --> 0
c    ( b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0 ∧  p_522) -> (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧ -b^{261, 3}_0)
c  in CNF:
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_2
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_1
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_0
c  in DIMACS:
-22958  22959 -22960 -522 -22961 0
-22958  22959 -22960 -522 -22962 0
-22958  22959 -22960 -522 -22963 0

c  0+1 --> 1
c    (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧  p_522) -> (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0)
c  in CNF:
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_2
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_1
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨  b^{261, 3}_0
c  in DIMACS:
 22958  22959  22960 -522 -22961 0
 22958  22959  22960 -522 -22962 0
 22958  22959  22960 -522  22963 0

c  1+1 --> 2
c    (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0 ∧  p_522) -> (-b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0)
c  in CNF:
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_2
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨  b^{261, 3}_1
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ -p_522 ∨ -b^{261, 3}_0
c  in DIMACS:
 22958  22959 -22960 -522 -22961 0
 22958  22959 -22960 -522  22962 0
 22958  22959 -22960 -522 -22963 0

c  2+1 --> break 
c    (-b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧  p_522) -> break
c  in CNF:
c     b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ -p_522 ∨ break
c  in DIMACS:
 22958 -22959  22960 -522 1162 0


c  2-1 --> 1
c    (-b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧ -p_522) -> (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0)
c  in CNF:
c     b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_2
c     b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_1
c     b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨  b^{261, 3}_0
c  in DIMACS:
 22958 -22959  22960  522 -22961 0
 22958 -22959  22960  522 -22962 0
 22958 -22959  22960  522  22963 0

c  1-1 --> 0
c    (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0 ∧ -p_522) -> (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧ -b^{261, 3}_0)
c  in CNF:
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_2
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_1
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_0
c  in DIMACS:
 22958  22959 -22960  522 -22961 0
 22958  22959 -22960  522 -22962 0
 22958  22959 -22960  522 -22963 0

c  0-1 --> -1
c    (-b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧ -p_522) -> ( b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0)
c  in CNF:
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨  b^{261, 3}_2
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_1
c     b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨  b^{261, 3}_0
c  in DIMACS:
 22958  22959  22960  522  22961 0
 22958  22959  22960  522 -22962 0
 22958  22959  22960  522  22963 0

c  -1-1 --> -2
c    ( b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧  b^{261, 2}_0 ∧ -p_522) -> ( b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0)
c  in CNF:
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨  b^{261, 3}_2
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨  b^{261, 3}_1
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨  p_522 ∨ -b^{261, 3}_0
c  in DIMACS:
-22958  22959 -22960  522  22961 0
-22958  22959 -22960  522  22962 0
-22958  22959 -22960  522 -22963 0

c  -2-1 --> break 
c    ( b^{261, 2}_2 ∧  b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧ -p_522) -> break
c  in CNF:
c    -b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨  b^{261, 2}_0 ∨  p_522 ∨ break
c  in DIMACS:
-22958 -22959  22960  522 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{261, 2}_2 ∧ -b^{261, 2}_1 ∧ -b^{261, 2}_0 ∧ true) 
c  in CNF:
c    -b^{261, 2}_2 ∨  b^{261, 2}_1 ∨  b^{261, 2}_0 ∨ false 
c  in DIMACS:
-22958  22959  22960  0

c  3 does not represent an automaton state.
c    -(-b^{261, 2}_2 ∧  b^{261, 2}_1 ∧  b^{261, 2}_0 ∧ true) 
c  in CNF:
c     b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ false 
c  in DIMACS:
 22958 -22959 -22960  0
c  -3 does not represent an automaton state.
c    -( b^{261, 2}_2 ∧  b^{261, 2}_1 ∧  b^{261, 2}_0 ∧ true) 
c  in CNF:
c    -b^{261, 2}_2 ∨ -b^{261, 2}_1 ∨ -b^{261, 2}_0 ∨ false 
c  in DIMACS:
-22958 -22959 -22960  0

c i = 3
c  -2+1 --> -1
c    ( b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧  p_783) -> ( b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0)
c  in CNF:
c    -b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨  b^{261, 4}_2
c    -b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_1
c    -b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨  b^{261, 4}_0
c  in DIMACS:
-22961 -22962  22963 -783  22964 0
-22961 -22962  22963 -783 -22965 0
-22961 -22962  22963 -783  22966 0

c  -1+1 --> 0
c    ( b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0 ∧  p_783) -> (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧ -b^{261, 4}_0)
c  in CNF:
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_2
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_1
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_0
c  in DIMACS:
-22961  22962 -22963 -783 -22964 0
-22961  22962 -22963 -783 -22965 0
-22961  22962 -22963 -783 -22966 0

c  0+1 --> 1
c    (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧  p_783) -> (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0)
c  in CNF:
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_2
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_1
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨  b^{261, 4}_0
c  in DIMACS:
 22961  22962  22963 -783 -22964 0
 22961  22962  22963 -783 -22965 0
 22961  22962  22963 -783  22966 0

c  1+1 --> 2
c    (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0 ∧  p_783) -> (-b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0)
c  in CNF:
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_2
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨  b^{261, 4}_1
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ -p_783 ∨ -b^{261, 4}_0
c  in DIMACS:
 22961  22962 -22963 -783 -22964 0
 22961  22962 -22963 -783  22965 0
 22961  22962 -22963 -783 -22966 0

c  2+1 --> break 
c    (-b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧  p_783) -> break
c  in CNF:
c     b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ -p_783 ∨ break
c  in DIMACS:
 22961 -22962  22963 -783 1162 0


c  2-1 --> 1
c    (-b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧ -p_783) -> (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0)
c  in CNF:
c     b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_2
c     b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_1
c     b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨  b^{261, 4}_0
c  in DIMACS:
 22961 -22962  22963  783 -22964 0
 22961 -22962  22963  783 -22965 0
 22961 -22962  22963  783  22966 0

c  1-1 --> 0
c    (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0 ∧ -p_783) -> (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧ -b^{261, 4}_0)
c  in CNF:
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_2
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_1
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_0
c  in DIMACS:
 22961  22962 -22963  783 -22964 0
 22961  22962 -22963  783 -22965 0
 22961  22962 -22963  783 -22966 0

c  0-1 --> -1
c    (-b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧ -p_783) -> ( b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0)
c  in CNF:
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨  b^{261, 4}_2
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_1
c     b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨  b^{261, 4}_0
c  in DIMACS:
 22961  22962  22963  783  22964 0
 22961  22962  22963  783 -22965 0
 22961  22962  22963  783  22966 0

c  -1-1 --> -2
c    ( b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧  b^{261, 3}_0 ∧ -p_783) -> ( b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0)
c  in CNF:
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨  b^{261, 4}_2
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨  b^{261, 4}_1
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨  p_783 ∨ -b^{261, 4}_0
c  in DIMACS:
-22961  22962 -22963  783  22964 0
-22961  22962 -22963  783  22965 0
-22961  22962 -22963  783 -22966 0

c  -2-1 --> break 
c    ( b^{261, 3}_2 ∧  b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧ -p_783) -> break
c  in CNF:
c    -b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨  b^{261, 3}_0 ∨  p_783 ∨ break
c  in DIMACS:
-22961 -22962  22963  783 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{261, 3}_2 ∧ -b^{261, 3}_1 ∧ -b^{261, 3}_0 ∧ true) 
c  in CNF:
c    -b^{261, 3}_2 ∨  b^{261, 3}_1 ∨  b^{261, 3}_0 ∨ false 
c  in DIMACS:
-22961  22962  22963  0

c  3 does not represent an automaton state.
c    -(-b^{261, 3}_2 ∧  b^{261, 3}_1 ∧  b^{261, 3}_0 ∧ true) 
c  in CNF:
c     b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ false 
c  in DIMACS:
 22961 -22962 -22963  0
c  -3 does not represent an automaton state.
c    -( b^{261, 3}_2 ∧  b^{261, 3}_1 ∧  b^{261, 3}_0 ∧ true) 
c  in CNF:
c    -b^{261, 3}_2 ∨ -b^{261, 3}_1 ∨ -b^{261, 3}_0 ∨ false 
c  in DIMACS:
-22961 -22962 -22963  0

c i = 4
c  -2+1 --> -1
c    ( b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧  p_1044) -> ( b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧  b^{261, 5}_0)
c  in CNF:
c    -b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨  b^{261, 5}_2
c    -b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_1
c    -b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨  b^{261, 5}_0
c  in DIMACS:
-22964 -22965  22966 -1044  22967 0
-22964 -22965  22966 -1044 -22968 0
-22964 -22965  22966 -1044  22969 0

c  -1+1 --> 0
c    ( b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0 ∧  p_1044) -> (-b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧ -b^{261, 5}_0)
c  in CNF:
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_2
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_1
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_0
c  in DIMACS:
-22964  22965 -22966 -1044 -22967 0
-22964  22965 -22966 -1044 -22968 0
-22964  22965 -22966 -1044 -22969 0

c  0+1 --> 1
c    (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧  p_1044) -> (-b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧  b^{261, 5}_0)
c  in CNF:
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_2
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_1
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨  b^{261, 5}_0
c  in DIMACS:
 22964  22965  22966 -1044 -22967 0
 22964  22965  22966 -1044 -22968 0
 22964  22965  22966 -1044  22969 0

c  1+1 --> 2
c    (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0 ∧  p_1044) -> (-b^{261, 5}_2 ∧  b^{261, 5}_1 ∧ -b^{261, 5}_0)
c  in CNF:
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_2
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨  b^{261, 5}_1
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ -p_1044 ∨ -b^{261, 5}_0
c  in DIMACS:
 22964  22965 -22966 -1044 -22967 0
 22964  22965 -22966 -1044  22968 0
 22964  22965 -22966 -1044 -22969 0

c  2+1 --> break 
c    (-b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 22964 -22965  22966 -1044 1162 0


c  2-1 --> 1
c    (-b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧ -p_1044) -> (-b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧  b^{261, 5}_0)
c  in CNF:
c     b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_2
c     b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_1
c     b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨  b^{261, 5}_0
c  in DIMACS:
 22964 -22965  22966  1044 -22967 0
 22964 -22965  22966  1044 -22968 0
 22964 -22965  22966  1044  22969 0

c  1-1 --> 0
c    (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0 ∧ -p_1044) -> (-b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧ -b^{261, 5}_0)
c  in CNF:
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_2
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_1
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_0
c  in DIMACS:
 22964  22965 -22966  1044 -22967 0
 22964  22965 -22966  1044 -22968 0
 22964  22965 -22966  1044 -22969 0

c  0-1 --> -1
c    (-b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧ -p_1044) -> ( b^{261, 5}_2 ∧ -b^{261, 5}_1 ∧  b^{261, 5}_0)
c  in CNF:
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨  b^{261, 5}_2
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_1
c     b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨  b^{261, 5}_0
c  in DIMACS:
 22964  22965  22966  1044  22967 0
 22964  22965  22966  1044 -22968 0
 22964  22965  22966  1044  22969 0

c  -1-1 --> -2
c    ( b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧  b^{261, 4}_0 ∧ -p_1044) -> ( b^{261, 5}_2 ∧  b^{261, 5}_1 ∧ -b^{261, 5}_0)
c  in CNF:
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨  b^{261, 5}_2
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨  b^{261, 5}_1
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨  p_1044 ∨ -b^{261, 5}_0
c  in DIMACS:
-22964  22965 -22966  1044  22967 0
-22964  22965 -22966  1044  22968 0
-22964  22965 -22966  1044 -22969 0

c  -2-1 --> break 
c    ( b^{261, 4}_2 ∧  b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨  b^{261, 4}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-22964 -22965  22966  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{261, 4}_2 ∧ -b^{261, 4}_1 ∧ -b^{261, 4}_0 ∧ true) 
c  in CNF:
c    -b^{261, 4}_2 ∨  b^{261, 4}_1 ∨  b^{261, 4}_0 ∨ false 
c  in DIMACS:
-22964  22965  22966  0

c  3 does not represent an automaton state.
c    -(-b^{261, 4}_2 ∧  b^{261, 4}_1 ∧  b^{261, 4}_0 ∧ true) 
c  in CNF:
c     b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ false 
c  in DIMACS:
 22964 -22965 -22966  0
c  -3 does not represent an automaton state.
c    -( b^{261, 4}_2 ∧  b^{261, 4}_1 ∧  b^{261, 4}_0 ∧ true) 
c  in CNF:
c    -b^{261, 4}_2 ∨ -b^{261, 4}_1 ∨ -b^{261, 4}_0 ∨ false 
c  in DIMACS:
-22964 -22965 -22966  0

c INIT for k = 262
c    -b^{262, 1}_2
c    -b^{262, 1}_1
c    -b^{262, 1}_0
c  in DIMACS:
-22970 0
-22971 0
-22972 0

c Transitions for k = 262
c i = 1
c  -2+1 --> -1
c    ( b^{262, 1}_2 ∧  b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧  p_262) -> ( b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0)
c  in CNF:
c    -b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨  b^{262, 2}_2
c    -b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_1
c    -b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨  b^{262, 2}_0
c  in DIMACS:
-22970 -22971  22972 -262  22973 0
-22970 -22971  22972 -262 -22974 0
-22970 -22971  22972 -262  22975 0

c  -1+1 --> 0
c    ( b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧  b^{262, 1}_0 ∧  p_262) -> (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧ -b^{262, 2}_0)
c  in CNF:
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_2
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_1
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_0
c  in DIMACS:
-22970  22971 -22972 -262 -22973 0
-22970  22971 -22972 -262 -22974 0
-22970  22971 -22972 -262 -22975 0

c  0+1 --> 1
c    (-b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧  p_262) -> (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0)
c  in CNF:
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_2
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_1
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨  b^{262, 2}_0
c  in DIMACS:
 22970  22971  22972 -262 -22973 0
 22970  22971  22972 -262 -22974 0
 22970  22971  22972 -262  22975 0

c  1+1 --> 2
c    (-b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧  b^{262, 1}_0 ∧  p_262) -> (-b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0)
c  in CNF:
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_2
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨  b^{262, 2}_1
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ -p_262 ∨ -b^{262, 2}_0
c  in DIMACS:
 22970  22971 -22972 -262 -22973 0
 22970  22971 -22972 -262  22974 0
 22970  22971 -22972 -262 -22975 0

c  2+1 --> break 
c    (-b^{262, 1}_2 ∧  b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧  p_262) -> break
c  in CNF:
c     b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ -p_262 ∨ break
c  in DIMACS:
 22970 -22971  22972 -262 1162 0


c  2-1 --> 1
c    (-b^{262, 1}_2 ∧  b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧ -p_262) -> (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0)
c  in CNF:
c     b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_2
c     b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_1
c     b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨  b^{262, 2}_0
c  in DIMACS:
 22970 -22971  22972  262 -22973 0
 22970 -22971  22972  262 -22974 0
 22970 -22971  22972  262  22975 0

c  1-1 --> 0
c    (-b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧  b^{262, 1}_0 ∧ -p_262) -> (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧ -b^{262, 2}_0)
c  in CNF:
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_2
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_1
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_0
c  in DIMACS:
 22970  22971 -22972  262 -22973 0
 22970  22971 -22972  262 -22974 0
 22970  22971 -22972  262 -22975 0

c  0-1 --> -1
c    (-b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧ -p_262) -> ( b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0)
c  in CNF:
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨  b^{262, 2}_2
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_1
c     b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨  b^{262, 2}_0
c  in DIMACS:
 22970  22971  22972  262  22973 0
 22970  22971  22972  262 -22974 0
 22970  22971  22972  262  22975 0

c  -1-1 --> -2
c    ( b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧  b^{262, 1}_0 ∧ -p_262) -> ( b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0)
c  in CNF:
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨  b^{262, 2}_2
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨  b^{262, 2}_1
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨  p_262 ∨ -b^{262, 2}_0
c  in DIMACS:
-22970  22971 -22972  262  22973 0
-22970  22971 -22972  262  22974 0
-22970  22971 -22972  262 -22975 0

c  -2-1 --> break 
c    ( b^{262, 1}_2 ∧  b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧ -p_262) -> break
c  in CNF:
c    -b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨  b^{262, 1}_0 ∨  p_262 ∨ break
c  in DIMACS:
-22970 -22971  22972  262 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{262, 1}_2 ∧ -b^{262, 1}_1 ∧ -b^{262, 1}_0 ∧ true) 
c  in CNF:
c    -b^{262, 1}_2 ∨  b^{262, 1}_1 ∨  b^{262, 1}_0 ∨ false 
c  in DIMACS:
-22970  22971  22972  0

c  3 does not represent an automaton state.
c    -(-b^{262, 1}_2 ∧  b^{262, 1}_1 ∧  b^{262, 1}_0 ∧ true) 
c  in CNF:
c     b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ false 
c  in DIMACS:
 22970 -22971 -22972  0
c  -3 does not represent an automaton state.
c    -( b^{262, 1}_2 ∧  b^{262, 1}_1 ∧  b^{262, 1}_0 ∧ true) 
c  in CNF:
c    -b^{262, 1}_2 ∨ -b^{262, 1}_1 ∨ -b^{262, 1}_0 ∨ false 
c  in DIMACS:
-22970 -22971 -22972  0

c i = 2
c  -2+1 --> -1
c    ( b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧  p_524) -> ( b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0)
c  in CNF:
c    -b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨  b^{262, 3}_2
c    -b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_1
c    -b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨  b^{262, 3}_0
c  in DIMACS:
-22973 -22974  22975 -524  22976 0
-22973 -22974  22975 -524 -22977 0
-22973 -22974  22975 -524  22978 0

c  -1+1 --> 0
c    ( b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0 ∧  p_524) -> (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧ -b^{262, 3}_0)
c  in CNF:
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_2
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_1
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_0
c  in DIMACS:
-22973  22974 -22975 -524 -22976 0
-22973  22974 -22975 -524 -22977 0
-22973  22974 -22975 -524 -22978 0

c  0+1 --> 1
c    (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧  p_524) -> (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0)
c  in CNF:
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_2
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_1
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨  b^{262, 3}_0
c  in DIMACS:
 22973  22974  22975 -524 -22976 0
 22973  22974  22975 -524 -22977 0
 22973  22974  22975 -524  22978 0

c  1+1 --> 2
c    (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0 ∧  p_524) -> (-b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0)
c  in CNF:
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_2
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨  b^{262, 3}_1
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ -p_524 ∨ -b^{262, 3}_0
c  in DIMACS:
 22973  22974 -22975 -524 -22976 0
 22973  22974 -22975 -524  22977 0
 22973  22974 -22975 -524 -22978 0

c  2+1 --> break 
c    (-b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧  p_524) -> break
c  in CNF:
c     b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ -p_524 ∨ break
c  in DIMACS:
 22973 -22974  22975 -524 1162 0


c  2-1 --> 1
c    (-b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧ -p_524) -> (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0)
c  in CNF:
c     b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_2
c     b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_1
c     b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨  b^{262, 3}_0
c  in DIMACS:
 22973 -22974  22975  524 -22976 0
 22973 -22974  22975  524 -22977 0
 22973 -22974  22975  524  22978 0

c  1-1 --> 0
c    (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0 ∧ -p_524) -> (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧ -b^{262, 3}_0)
c  in CNF:
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_2
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_1
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_0
c  in DIMACS:
 22973  22974 -22975  524 -22976 0
 22973  22974 -22975  524 -22977 0
 22973  22974 -22975  524 -22978 0

c  0-1 --> -1
c    (-b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧ -p_524) -> ( b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0)
c  in CNF:
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨  b^{262, 3}_2
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_1
c     b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨  b^{262, 3}_0
c  in DIMACS:
 22973  22974  22975  524  22976 0
 22973  22974  22975  524 -22977 0
 22973  22974  22975  524  22978 0

c  -1-1 --> -2
c    ( b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧  b^{262, 2}_0 ∧ -p_524) -> ( b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0)
c  in CNF:
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨  b^{262, 3}_2
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨  b^{262, 3}_1
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨  p_524 ∨ -b^{262, 3}_0
c  in DIMACS:
-22973  22974 -22975  524  22976 0
-22973  22974 -22975  524  22977 0
-22973  22974 -22975  524 -22978 0

c  -2-1 --> break 
c    ( b^{262, 2}_2 ∧  b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧ -p_524) -> break
c  in CNF:
c    -b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨  b^{262, 2}_0 ∨  p_524 ∨ break
c  in DIMACS:
-22973 -22974  22975  524 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{262, 2}_2 ∧ -b^{262, 2}_1 ∧ -b^{262, 2}_0 ∧ true) 
c  in CNF:
c    -b^{262, 2}_2 ∨  b^{262, 2}_1 ∨  b^{262, 2}_0 ∨ false 
c  in DIMACS:
-22973  22974  22975  0

c  3 does not represent an automaton state.
c    -(-b^{262, 2}_2 ∧  b^{262, 2}_1 ∧  b^{262, 2}_0 ∧ true) 
c  in CNF:
c     b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ false 
c  in DIMACS:
 22973 -22974 -22975  0
c  -3 does not represent an automaton state.
c    -( b^{262, 2}_2 ∧  b^{262, 2}_1 ∧  b^{262, 2}_0 ∧ true) 
c  in CNF:
c    -b^{262, 2}_2 ∨ -b^{262, 2}_1 ∨ -b^{262, 2}_0 ∨ false 
c  in DIMACS:
-22973 -22974 -22975  0

c i = 3
c  -2+1 --> -1
c    ( b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧  p_786) -> ( b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0)
c  in CNF:
c    -b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨  b^{262, 4}_2
c    -b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_1
c    -b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨  b^{262, 4}_0
c  in DIMACS:
-22976 -22977  22978 -786  22979 0
-22976 -22977  22978 -786 -22980 0
-22976 -22977  22978 -786  22981 0

c  -1+1 --> 0
c    ( b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0 ∧  p_786) -> (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧ -b^{262, 4}_0)
c  in CNF:
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_2
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_1
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_0
c  in DIMACS:
-22976  22977 -22978 -786 -22979 0
-22976  22977 -22978 -786 -22980 0
-22976  22977 -22978 -786 -22981 0

c  0+1 --> 1
c    (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧  p_786) -> (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0)
c  in CNF:
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_2
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_1
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨  b^{262, 4}_0
c  in DIMACS:
 22976  22977  22978 -786 -22979 0
 22976  22977  22978 -786 -22980 0
 22976  22977  22978 -786  22981 0

c  1+1 --> 2
c    (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0 ∧  p_786) -> (-b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0)
c  in CNF:
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_2
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨  b^{262, 4}_1
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ -p_786 ∨ -b^{262, 4}_0
c  in DIMACS:
 22976  22977 -22978 -786 -22979 0
 22976  22977 -22978 -786  22980 0
 22976  22977 -22978 -786 -22981 0

c  2+1 --> break 
c    (-b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧  p_786) -> break
c  in CNF:
c     b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ -p_786 ∨ break
c  in DIMACS:
 22976 -22977  22978 -786 1162 0


c  2-1 --> 1
c    (-b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧ -p_786) -> (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0)
c  in CNF:
c     b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_2
c     b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_1
c     b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨  b^{262, 4}_0
c  in DIMACS:
 22976 -22977  22978  786 -22979 0
 22976 -22977  22978  786 -22980 0
 22976 -22977  22978  786  22981 0

c  1-1 --> 0
c    (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0 ∧ -p_786) -> (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧ -b^{262, 4}_0)
c  in CNF:
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_2
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_1
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_0
c  in DIMACS:
 22976  22977 -22978  786 -22979 0
 22976  22977 -22978  786 -22980 0
 22976  22977 -22978  786 -22981 0

c  0-1 --> -1
c    (-b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧ -p_786) -> ( b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0)
c  in CNF:
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨  b^{262, 4}_2
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_1
c     b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨  b^{262, 4}_0
c  in DIMACS:
 22976  22977  22978  786  22979 0
 22976  22977  22978  786 -22980 0
 22976  22977  22978  786  22981 0

c  -1-1 --> -2
c    ( b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧  b^{262, 3}_0 ∧ -p_786) -> ( b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0)
c  in CNF:
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨  b^{262, 4}_2
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨  b^{262, 4}_1
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨  p_786 ∨ -b^{262, 4}_0
c  in DIMACS:
-22976  22977 -22978  786  22979 0
-22976  22977 -22978  786  22980 0
-22976  22977 -22978  786 -22981 0

c  -2-1 --> break 
c    ( b^{262, 3}_2 ∧  b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧ -p_786) -> break
c  in CNF:
c    -b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨  b^{262, 3}_0 ∨  p_786 ∨ break
c  in DIMACS:
-22976 -22977  22978  786 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{262, 3}_2 ∧ -b^{262, 3}_1 ∧ -b^{262, 3}_0 ∧ true) 
c  in CNF:
c    -b^{262, 3}_2 ∨  b^{262, 3}_1 ∨  b^{262, 3}_0 ∨ false 
c  in DIMACS:
-22976  22977  22978  0

c  3 does not represent an automaton state.
c    -(-b^{262, 3}_2 ∧  b^{262, 3}_1 ∧  b^{262, 3}_0 ∧ true) 
c  in CNF:
c     b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ false 
c  in DIMACS:
 22976 -22977 -22978  0
c  -3 does not represent an automaton state.
c    -( b^{262, 3}_2 ∧  b^{262, 3}_1 ∧  b^{262, 3}_0 ∧ true) 
c  in CNF:
c    -b^{262, 3}_2 ∨ -b^{262, 3}_1 ∨ -b^{262, 3}_0 ∨ false 
c  in DIMACS:
-22976 -22977 -22978  0

c i = 4
c  -2+1 --> -1
c    ( b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧  p_1048) -> ( b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧  b^{262, 5}_0)
c  in CNF:
c    -b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨  b^{262, 5}_2
c    -b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_1
c    -b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨  b^{262, 5}_0
c  in DIMACS:
-22979 -22980  22981 -1048  22982 0
-22979 -22980  22981 -1048 -22983 0
-22979 -22980  22981 -1048  22984 0

c  -1+1 --> 0
c    ( b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0 ∧  p_1048) -> (-b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧ -b^{262, 5}_0)
c  in CNF:
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_2
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_1
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_0
c  in DIMACS:
-22979  22980 -22981 -1048 -22982 0
-22979  22980 -22981 -1048 -22983 0
-22979  22980 -22981 -1048 -22984 0

c  0+1 --> 1
c    (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧  p_1048) -> (-b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧  b^{262, 5}_0)
c  in CNF:
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_2
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_1
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨  b^{262, 5}_0
c  in DIMACS:
 22979  22980  22981 -1048 -22982 0
 22979  22980  22981 -1048 -22983 0
 22979  22980  22981 -1048  22984 0

c  1+1 --> 2
c    (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0 ∧  p_1048) -> (-b^{262, 5}_2 ∧  b^{262, 5}_1 ∧ -b^{262, 5}_0)
c  in CNF:
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_2
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨  b^{262, 5}_1
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ -p_1048 ∨ -b^{262, 5}_0
c  in DIMACS:
 22979  22980 -22981 -1048 -22982 0
 22979  22980 -22981 -1048  22983 0
 22979  22980 -22981 -1048 -22984 0

c  2+1 --> break 
c    (-b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧  p_1048) -> break
c  in CNF:
c     b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ -p_1048 ∨ break
c  in DIMACS:
 22979 -22980  22981 -1048 1162 0


c  2-1 --> 1
c    (-b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧ -p_1048) -> (-b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧  b^{262, 5}_0)
c  in CNF:
c     b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_2
c     b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_1
c     b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨  b^{262, 5}_0
c  in DIMACS:
 22979 -22980  22981  1048 -22982 0
 22979 -22980  22981  1048 -22983 0
 22979 -22980  22981  1048  22984 0

c  1-1 --> 0
c    (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0 ∧ -p_1048) -> (-b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧ -b^{262, 5}_0)
c  in CNF:
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_2
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_1
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_0
c  in DIMACS:
 22979  22980 -22981  1048 -22982 0
 22979  22980 -22981  1048 -22983 0
 22979  22980 -22981  1048 -22984 0

c  0-1 --> -1
c    (-b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧ -p_1048) -> ( b^{262, 5}_2 ∧ -b^{262, 5}_1 ∧  b^{262, 5}_0)
c  in CNF:
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨  b^{262, 5}_2
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_1
c     b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨  b^{262, 5}_0
c  in DIMACS:
 22979  22980  22981  1048  22982 0
 22979  22980  22981  1048 -22983 0
 22979  22980  22981  1048  22984 0

c  -1-1 --> -2
c    ( b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧  b^{262, 4}_0 ∧ -p_1048) -> ( b^{262, 5}_2 ∧  b^{262, 5}_1 ∧ -b^{262, 5}_0)
c  in CNF:
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨  b^{262, 5}_2
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨  b^{262, 5}_1
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨  p_1048 ∨ -b^{262, 5}_0
c  in DIMACS:
-22979  22980 -22981  1048  22982 0
-22979  22980 -22981  1048  22983 0
-22979  22980 -22981  1048 -22984 0

c  -2-1 --> break 
c    ( b^{262, 4}_2 ∧  b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧ -p_1048) -> break
c  in CNF:
c    -b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨  b^{262, 4}_0 ∨  p_1048 ∨ break
c  in DIMACS:
-22979 -22980  22981  1048 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{262, 4}_2 ∧ -b^{262, 4}_1 ∧ -b^{262, 4}_0 ∧ true) 
c  in CNF:
c    -b^{262, 4}_2 ∨  b^{262, 4}_1 ∨  b^{262, 4}_0 ∨ false 
c  in DIMACS:
-22979  22980  22981  0

c  3 does not represent an automaton state.
c    -(-b^{262, 4}_2 ∧  b^{262, 4}_1 ∧  b^{262, 4}_0 ∧ true) 
c  in CNF:
c     b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ false 
c  in DIMACS:
 22979 -22980 -22981  0
c  -3 does not represent an automaton state.
c    -( b^{262, 4}_2 ∧  b^{262, 4}_1 ∧  b^{262, 4}_0 ∧ true) 
c  in CNF:
c    -b^{262, 4}_2 ∨ -b^{262, 4}_1 ∨ -b^{262, 4}_0 ∨ false 
c  in DIMACS:
-22979 -22980 -22981  0

c INIT for k = 263
c    -b^{263, 1}_2
c    -b^{263, 1}_1
c    -b^{263, 1}_0
c  in DIMACS:
-22985 0
-22986 0
-22987 0

c Transitions for k = 263
c i = 1
c  -2+1 --> -1
c    ( b^{263, 1}_2 ∧  b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧  p_263) -> ( b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0)
c  in CNF:
c    -b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨  b^{263, 2}_2
c    -b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_1
c    -b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨  b^{263, 2}_0
c  in DIMACS:
-22985 -22986  22987 -263  22988 0
-22985 -22986  22987 -263 -22989 0
-22985 -22986  22987 -263  22990 0

c  -1+1 --> 0
c    ( b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧  b^{263, 1}_0 ∧  p_263) -> (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧ -b^{263, 2}_0)
c  in CNF:
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_2
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_1
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_0
c  in DIMACS:
-22985  22986 -22987 -263 -22988 0
-22985  22986 -22987 -263 -22989 0
-22985  22986 -22987 -263 -22990 0

c  0+1 --> 1
c    (-b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧  p_263) -> (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0)
c  in CNF:
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_2
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_1
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨  b^{263, 2}_0
c  in DIMACS:
 22985  22986  22987 -263 -22988 0
 22985  22986  22987 -263 -22989 0
 22985  22986  22987 -263  22990 0

c  1+1 --> 2
c    (-b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧  b^{263, 1}_0 ∧  p_263) -> (-b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0)
c  in CNF:
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_2
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨  b^{263, 2}_1
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ -p_263 ∨ -b^{263, 2}_0
c  in DIMACS:
 22985  22986 -22987 -263 -22988 0
 22985  22986 -22987 -263  22989 0
 22985  22986 -22987 -263 -22990 0

c  2+1 --> break 
c    (-b^{263, 1}_2 ∧  b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧  p_263) -> break
c  in CNF:
c     b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ -p_263 ∨ break
c  in DIMACS:
 22985 -22986  22987 -263 1162 0


c  2-1 --> 1
c    (-b^{263, 1}_2 ∧  b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧ -p_263) -> (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0)
c  in CNF:
c     b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_2
c     b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_1
c     b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨  b^{263, 2}_0
c  in DIMACS:
 22985 -22986  22987  263 -22988 0
 22985 -22986  22987  263 -22989 0
 22985 -22986  22987  263  22990 0

c  1-1 --> 0
c    (-b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧  b^{263, 1}_0 ∧ -p_263) -> (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧ -b^{263, 2}_0)
c  in CNF:
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_2
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_1
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_0
c  in DIMACS:
 22985  22986 -22987  263 -22988 0
 22985  22986 -22987  263 -22989 0
 22985  22986 -22987  263 -22990 0

c  0-1 --> -1
c    (-b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧ -p_263) -> ( b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0)
c  in CNF:
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨  b^{263, 2}_2
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_1
c     b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨  b^{263, 2}_0
c  in DIMACS:
 22985  22986  22987  263  22988 0
 22985  22986  22987  263 -22989 0
 22985  22986  22987  263  22990 0

c  -1-1 --> -2
c    ( b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧  b^{263, 1}_0 ∧ -p_263) -> ( b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0)
c  in CNF:
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨  b^{263, 2}_2
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨  b^{263, 2}_1
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨  p_263 ∨ -b^{263, 2}_0
c  in DIMACS:
-22985  22986 -22987  263  22988 0
-22985  22986 -22987  263  22989 0
-22985  22986 -22987  263 -22990 0

c  -2-1 --> break 
c    ( b^{263, 1}_2 ∧  b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧ -p_263) -> break
c  in CNF:
c    -b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨  b^{263, 1}_0 ∨  p_263 ∨ break
c  in DIMACS:
-22985 -22986  22987  263 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{263, 1}_2 ∧ -b^{263, 1}_1 ∧ -b^{263, 1}_0 ∧ true) 
c  in CNF:
c    -b^{263, 1}_2 ∨  b^{263, 1}_1 ∨  b^{263, 1}_0 ∨ false 
c  in DIMACS:
-22985  22986  22987  0

c  3 does not represent an automaton state.
c    -(-b^{263, 1}_2 ∧  b^{263, 1}_1 ∧  b^{263, 1}_0 ∧ true) 
c  in CNF:
c     b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ false 
c  in DIMACS:
 22985 -22986 -22987  0
c  -3 does not represent an automaton state.
c    -( b^{263, 1}_2 ∧  b^{263, 1}_1 ∧  b^{263, 1}_0 ∧ true) 
c  in CNF:
c    -b^{263, 1}_2 ∨ -b^{263, 1}_1 ∨ -b^{263, 1}_0 ∨ false 
c  in DIMACS:
-22985 -22986 -22987  0

c i = 2
c  -2+1 --> -1
c    ( b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧  p_526) -> ( b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0)
c  in CNF:
c    -b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨  b^{263, 3}_2
c    -b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_1
c    -b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨  b^{263, 3}_0
c  in DIMACS:
-22988 -22989  22990 -526  22991 0
-22988 -22989  22990 -526 -22992 0
-22988 -22989  22990 -526  22993 0

c  -1+1 --> 0
c    ( b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0 ∧  p_526) -> (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧ -b^{263, 3}_0)
c  in CNF:
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_2
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_1
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_0
c  in DIMACS:
-22988  22989 -22990 -526 -22991 0
-22988  22989 -22990 -526 -22992 0
-22988  22989 -22990 -526 -22993 0

c  0+1 --> 1
c    (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧  p_526) -> (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0)
c  in CNF:
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_2
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_1
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨  b^{263, 3}_0
c  in DIMACS:
 22988  22989  22990 -526 -22991 0
 22988  22989  22990 -526 -22992 0
 22988  22989  22990 -526  22993 0

c  1+1 --> 2
c    (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0 ∧  p_526) -> (-b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0)
c  in CNF:
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_2
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨  b^{263, 3}_1
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ -p_526 ∨ -b^{263, 3}_0
c  in DIMACS:
 22988  22989 -22990 -526 -22991 0
 22988  22989 -22990 -526  22992 0
 22988  22989 -22990 -526 -22993 0

c  2+1 --> break 
c    (-b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧  p_526) -> break
c  in CNF:
c     b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ -p_526 ∨ break
c  in DIMACS:
 22988 -22989  22990 -526 1162 0


c  2-1 --> 1
c    (-b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧ -p_526) -> (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0)
c  in CNF:
c     b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_2
c     b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_1
c     b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨  b^{263, 3}_0
c  in DIMACS:
 22988 -22989  22990  526 -22991 0
 22988 -22989  22990  526 -22992 0
 22988 -22989  22990  526  22993 0

c  1-1 --> 0
c    (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0 ∧ -p_526) -> (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧ -b^{263, 3}_0)
c  in CNF:
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_2
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_1
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_0
c  in DIMACS:
 22988  22989 -22990  526 -22991 0
 22988  22989 -22990  526 -22992 0
 22988  22989 -22990  526 -22993 0

c  0-1 --> -1
c    (-b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧ -p_526) -> ( b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0)
c  in CNF:
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨  b^{263, 3}_2
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_1
c     b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨  b^{263, 3}_0
c  in DIMACS:
 22988  22989  22990  526  22991 0
 22988  22989  22990  526 -22992 0
 22988  22989  22990  526  22993 0

c  -1-1 --> -2
c    ( b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧  b^{263, 2}_0 ∧ -p_526) -> ( b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0)
c  in CNF:
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨  b^{263, 3}_2
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨  b^{263, 3}_1
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨  p_526 ∨ -b^{263, 3}_0
c  in DIMACS:
-22988  22989 -22990  526  22991 0
-22988  22989 -22990  526  22992 0
-22988  22989 -22990  526 -22993 0

c  -2-1 --> break 
c    ( b^{263, 2}_2 ∧  b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧ -p_526) -> break
c  in CNF:
c    -b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨  b^{263, 2}_0 ∨  p_526 ∨ break
c  in DIMACS:
-22988 -22989  22990  526 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{263, 2}_2 ∧ -b^{263, 2}_1 ∧ -b^{263, 2}_0 ∧ true) 
c  in CNF:
c    -b^{263, 2}_2 ∨  b^{263, 2}_1 ∨  b^{263, 2}_0 ∨ false 
c  in DIMACS:
-22988  22989  22990  0

c  3 does not represent an automaton state.
c    -(-b^{263, 2}_2 ∧  b^{263, 2}_1 ∧  b^{263, 2}_0 ∧ true) 
c  in CNF:
c     b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ false 
c  in DIMACS:
 22988 -22989 -22990  0
c  -3 does not represent an automaton state.
c    -( b^{263, 2}_2 ∧  b^{263, 2}_1 ∧  b^{263, 2}_0 ∧ true) 
c  in CNF:
c    -b^{263, 2}_2 ∨ -b^{263, 2}_1 ∨ -b^{263, 2}_0 ∨ false 
c  in DIMACS:
-22988 -22989 -22990  0

c i = 3
c  -2+1 --> -1
c    ( b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧  p_789) -> ( b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0)
c  in CNF:
c    -b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨  b^{263, 4}_2
c    -b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_1
c    -b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨  b^{263, 4}_0
c  in DIMACS:
-22991 -22992  22993 -789  22994 0
-22991 -22992  22993 -789 -22995 0
-22991 -22992  22993 -789  22996 0

c  -1+1 --> 0
c    ( b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0 ∧  p_789) -> (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧ -b^{263, 4}_0)
c  in CNF:
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_2
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_1
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_0
c  in DIMACS:
-22991  22992 -22993 -789 -22994 0
-22991  22992 -22993 -789 -22995 0
-22991  22992 -22993 -789 -22996 0

c  0+1 --> 1
c    (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧  p_789) -> (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0)
c  in CNF:
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_2
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_1
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨  b^{263, 4}_0
c  in DIMACS:
 22991  22992  22993 -789 -22994 0
 22991  22992  22993 -789 -22995 0
 22991  22992  22993 -789  22996 0

c  1+1 --> 2
c    (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0 ∧  p_789) -> (-b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0)
c  in CNF:
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_2
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨  b^{263, 4}_1
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ -p_789 ∨ -b^{263, 4}_0
c  in DIMACS:
 22991  22992 -22993 -789 -22994 0
 22991  22992 -22993 -789  22995 0
 22991  22992 -22993 -789 -22996 0

c  2+1 --> break 
c    (-b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧  p_789) -> break
c  in CNF:
c     b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ -p_789 ∨ break
c  in DIMACS:
 22991 -22992  22993 -789 1162 0


c  2-1 --> 1
c    (-b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧ -p_789) -> (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0)
c  in CNF:
c     b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_2
c     b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_1
c     b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨  b^{263, 4}_0
c  in DIMACS:
 22991 -22992  22993  789 -22994 0
 22991 -22992  22993  789 -22995 0
 22991 -22992  22993  789  22996 0

c  1-1 --> 0
c    (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0 ∧ -p_789) -> (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧ -b^{263, 4}_0)
c  in CNF:
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_2
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_1
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_0
c  in DIMACS:
 22991  22992 -22993  789 -22994 0
 22991  22992 -22993  789 -22995 0
 22991  22992 -22993  789 -22996 0

c  0-1 --> -1
c    (-b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧ -p_789) -> ( b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0)
c  in CNF:
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨  b^{263, 4}_2
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_1
c     b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨  b^{263, 4}_0
c  in DIMACS:
 22991  22992  22993  789  22994 0
 22991  22992  22993  789 -22995 0
 22991  22992  22993  789  22996 0

c  -1-1 --> -2
c    ( b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧  b^{263, 3}_0 ∧ -p_789) -> ( b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0)
c  in CNF:
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨  b^{263, 4}_2
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨  b^{263, 4}_1
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨  p_789 ∨ -b^{263, 4}_0
c  in DIMACS:
-22991  22992 -22993  789  22994 0
-22991  22992 -22993  789  22995 0
-22991  22992 -22993  789 -22996 0

c  -2-1 --> break 
c    ( b^{263, 3}_2 ∧  b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧ -p_789) -> break
c  in CNF:
c    -b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨  b^{263, 3}_0 ∨  p_789 ∨ break
c  in DIMACS:
-22991 -22992  22993  789 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{263, 3}_2 ∧ -b^{263, 3}_1 ∧ -b^{263, 3}_0 ∧ true) 
c  in CNF:
c    -b^{263, 3}_2 ∨  b^{263, 3}_1 ∨  b^{263, 3}_0 ∨ false 
c  in DIMACS:
-22991  22992  22993  0

c  3 does not represent an automaton state.
c    -(-b^{263, 3}_2 ∧  b^{263, 3}_1 ∧  b^{263, 3}_0 ∧ true) 
c  in CNF:
c     b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ false 
c  in DIMACS:
 22991 -22992 -22993  0
c  -3 does not represent an automaton state.
c    -( b^{263, 3}_2 ∧  b^{263, 3}_1 ∧  b^{263, 3}_0 ∧ true) 
c  in CNF:
c    -b^{263, 3}_2 ∨ -b^{263, 3}_1 ∨ -b^{263, 3}_0 ∨ false 
c  in DIMACS:
-22991 -22992 -22993  0

c i = 4
c  -2+1 --> -1
c    ( b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧  p_1052) -> ( b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧  b^{263, 5}_0)
c  in CNF:
c    -b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨  b^{263, 5}_2
c    -b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_1
c    -b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨  b^{263, 5}_0
c  in DIMACS:
-22994 -22995  22996 -1052  22997 0
-22994 -22995  22996 -1052 -22998 0
-22994 -22995  22996 -1052  22999 0

c  -1+1 --> 0
c    ( b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0 ∧  p_1052) -> (-b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧ -b^{263, 5}_0)
c  in CNF:
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_2
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_1
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_0
c  in DIMACS:
-22994  22995 -22996 -1052 -22997 0
-22994  22995 -22996 -1052 -22998 0
-22994  22995 -22996 -1052 -22999 0

c  0+1 --> 1
c    (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧  p_1052) -> (-b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧  b^{263, 5}_0)
c  in CNF:
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_2
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_1
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨  b^{263, 5}_0
c  in DIMACS:
 22994  22995  22996 -1052 -22997 0
 22994  22995  22996 -1052 -22998 0
 22994  22995  22996 -1052  22999 0

c  1+1 --> 2
c    (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0 ∧  p_1052) -> (-b^{263, 5}_2 ∧  b^{263, 5}_1 ∧ -b^{263, 5}_0)
c  in CNF:
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_2
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨  b^{263, 5}_1
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ -p_1052 ∨ -b^{263, 5}_0
c  in DIMACS:
 22994  22995 -22996 -1052 -22997 0
 22994  22995 -22996 -1052  22998 0
 22994  22995 -22996 -1052 -22999 0

c  2+1 --> break 
c    (-b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧  p_1052) -> break
c  in CNF:
c     b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ -p_1052 ∨ break
c  in DIMACS:
 22994 -22995  22996 -1052 1162 0


c  2-1 --> 1
c    (-b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧ -p_1052) -> (-b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧  b^{263, 5}_0)
c  in CNF:
c     b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_2
c     b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_1
c     b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨  b^{263, 5}_0
c  in DIMACS:
 22994 -22995  22996  1052 -22997 0
 22994 -22995  22996  1052 -22998 0
 22994 -22995  22996  1052  22999 0

c  1-1 --> 0
c    (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0 ∧ -p_1052) -> (-b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧ -b^{263, 5}_0)
c  in CNF:
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_2
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_1
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_0
c  in DIMACS:
 22994  22995 -22996  1052 -22997 0
 22994  22995 -22996  1052 -22998 0
 22994  22995 -22996  1052 -22999 0

c  0-1 --> -1
c    (-b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧ -p_1052) -> ( b^{263, 5}_2 ∧ -b^{263, 5}_1 ∧  b^{263, 5}_0)
c  in CNF:
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨  b^{263, 5}_2
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_1
c     b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨  b^{263, 5}_0
c  in DIMACS:
 22994  22995  22996  1052  22997 0
 22994  22995  22996  1052 -22998 0
 22994  22995  22996  1052  22999 0

c  -1-1 --> -2
c    ( b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧  b^{263, 4}_0 ∧ -p_1052) -> ( b^{263, 5}_2 ∧  b^{263, 5}_1 ∧ -b^{263, 5}_0)
c  in CNF:
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨  b^{263, 5}_2
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨  b^{263, 5}_1
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨  p_1052 ∨ -b^{263, 5}_0
c  in DIMACS:
-22994  22995 -22996  1052  22997 0
-22994  22995 -22996  1052  22998 0
-22994  22995 -22996  1052 -22999 0

c  -2-1 --> break 
c    ( b^{263, 4}_2 ∧  b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧ -p_1052) -> break
c  in CNF:
c    -b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨  b^{263, 4}_0 ∨  p_1052 ∨ break
c  in DIMACS:
-22994 -22995  22996  1052 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{263, 4}_2 ∧ -b^{263, 4}_1 ∧ -b^{263, 4}_0 ∧ true) 
c  in CNF:
c    -b^{263, 4}_2 ∨  b^{263, 4}_1 ∨  b^{263, 4}_0 ∨ false 
c  in DIMACS:
-22994  22995  22996  0

c  3 does not represent an automaton state.
c    -(-b^{263, 4}_2 ∧  b^{263, 4}_1 ∧  b^{263, 4}_0 ∧ true) 
c  in CNF:
c     b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ false 
c  in DIMACS:
 22994 -22995 -22996  0
c  -3 does not represent an automaton state.
c    -( b^{263, 4}_2 ∧  b^{263, 4}_1 ∧  b^{263, 4}_0 ∧ true) 
c  in CNF:
c    -b^{263, 4}_2 ∨ -b^{263, 4}_1 ∨ -b^{263, 4}_0 ∨ false 
c  in DIMACS:
-22994 -22995 -22996  0

c INIT for k = 264
c    -b^{264, 1}_2
c    -b^{264, 1}_1
c    -b^{264, 1}_0
c  in DIMACS:
-23000 0
-23001 0
-23002 0

c Transitions for k = 264
c i = 1
c  -2+1 --> -1
c    ( b^{264, 1}_2 ∧  b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧  p_264) -> ( b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0)
c  in CNF:
c    -b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨  b^{264, 2}_2
c    -b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_1
c    -b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨  b^{264, 2}_0
c  in DIMACS:
-23000 -23001  23002 -264  23003 0
-23000 -23001  23002 -264 -23004 0
-23000 -23001  23002 -264  23005 0

c  -1+1 --> 0
c    ( b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧  b^{264, 1}_0 ∧  p_264) -> (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧ -b^{264, 2}_0)
c  in CNF:
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_2
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_1
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_0
c  in DIMACS:
-23000  23001 -23002 -264 -23003 0
-23000  23001 -23002 -264 -23004 0
-23000  23001 -23002 -264 -23005 0

c  0+1 --> 1
c    (-b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧  p_264) -> (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0)
c  in CNF:
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_2
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_1
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨  b^{264, 2}_0
c  in DIMACS:
 23000  23001  23002 -264 -23003 0
 23000  23001  23002 -264 -23004 0
 23000  23001  23002 -264  23005 0

c  1+1 --> 2
c    (-b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧  b^{264, 1}_0 ∧  p_264) -> (-b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0)
c  in CNF:
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_2
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨  b^{264, 2}_1
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ -p_264 ∨ -b^{264, 2}_0
c  in DIMACS:
 23000  23001 -23002 -264 -23003 0
 23000  23001 -23002 -264  23004 0
 23000  23001 -23002 -264 -23005 0

c  2+1 --> break 
c    (-b^{264, 1}_2 ∧  b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧  p_264) -> break
c  in CNF:
c     b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ -p_264 ∨ break
c  in DIMACS:
 23000 -23001  23002 -264 1162 0


c  2-1 --> 1
c    (-b^{264, 1}_2 ∧  b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧ -p_264) -> (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0)
c  in CNF:
c     b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_2
c     b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_1
c     b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨  b^{264, 2}_0
c  in DIMACS:
 23000 -23001  23002  264 -23003 0
 23000 -23001  23002  264 -23004 0
 23000 -23001  23002  264  23005 0

c  1-1 --> 0
c    (-b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧  b^{264, 1}_0 ∧ -p_264) -> (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧ -b^{264, 2}_0)
c  in CNF:
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_2
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_1
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_0
c  in DIMACS:
 23000  23001 -23002  264 -23003 0
 23000  23001 -23002  264 -23004 0
 23000  23001 -23002  264 -23005 0

c  0-1 --> -1
c    (-b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧ -p_264) -> ( b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0)
c  in CNF:
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨  b^{264, 2}_2
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_1
c     b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨  b^{264, 2}_0
c  in DIMACS:
 23000  23001  23002  264  23003 0
 23000  23001  23002  264 -23004 0
 23000  23001  23002  264  23005 0

c  -1-1 --> -2
c    ( b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧  b^{264, 1}_0 ∧ -p_264) -> ( b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0)
c  in CNF:
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨  b^{264, 2}_2
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨  b^{264, 2}_1
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨  p_264 ∨ -b^{264, 2}_0
c  in DIMACS:
-23000  23001 -23002  264  23003 0
-23000  23001 -23002  264  23004 0
-23000  23001 -23002  264 -23005 0

c  -2-1 --> break 
c    ( b^{264, 1}_2 ∧  b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧ -p_264) -> break
c  in CNF:
c    -b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨  b^{264, 1}_0 ∨  p_264 ∨ break
c  in DIMACS:
-23000 -23001  23002  264 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{264, 1}_2 ∧ -b^{264, 1}_1 ∧ -b^{264, 1}_0 ∧ true) 
c  in CNF:
c    -b^{264, 1}_2 ∨  b^{264, 1}_1 ∨  b^{264, 1}_0 ∨ false 
c  in DIMACS:
-23000  23001  23002  0

c  3 does not represent an automaton state.
c    -(-b^{264, 1}_2 ∧  b^{264, 1}_1 ∧  b^{264, 1}_0 ∧ true) 
c  in CNF:
c     b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ false 
c  in DIMACS:
 23000 -23001 -23002  0
c  -3 does not represent an automaton state.
c    -( b^{264, 1}_2 ∧  b^{264, 1}_1 ∧  b^{264, 1}_0 ∧ true) 
c  in CNF:
c    -b^{264, 1}_2 ∨ -b^{264, 1}_1 ∨ -b^{264, 1}_0 ∨ false 
c  in DIMACS:
-23000 -23001 -23002  0

c i = 2
c  -2+1 --> -1
c    ( b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧  p_528) -> ( b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0)
c  in CNF:
c    -b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨  b^{264, 3}_2
c    -b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_1
c    -b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨  b^{264, 3}_0
c  in DIMACS:
-23003 -23004  23005 -528  23006 0
-23003 -23004  23005 -528 -23007 0
-23003 -23004  23005 -528  23008 0

c  -1+1 --> 0
c    ( b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0 ∧  p_528) -> (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧ -b^{264, 3}_0)
c  in CNF:
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_2
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_1
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_0
c  in DIMACS:
-23003  23004 -23005 -528 -23006 0
-23003  23004 -23005 -528 -23007 0
-23003  23004 -23005 -528 -23008 0

c  0+1 --> 1
c    (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧  p_528) -> (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0)
c  in CNF:
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_2
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_1
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨  b^{264, 3}_0
c  in DIMACS:
 23003  23004  23005 -528 -23006 0
 23003  23004  23005 -528 -23007 0
 23003  23004  23005 -528  23008 0

c  1+1 --> 2
c    (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0 ∧  p_528) -> (-b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0)
c  in CNF:
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_2
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨  b^{264, 3}_1
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ -p_528 ∨ -b^{264, 3}_0
c  in DIMACS:
 23003  23004 -23005 -528 -23006 0
 23003  23004 -23005 -528  23007 0
 23003  23004 -23005 -528 -23008 0

c  2+1 --> break 
c    (-b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧  p_528) -> break
c  in CNF:
c     b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ -p_528 ∨ break
c  in DIMACS:
 23003 -23004  23005 -528 1162 0


c  2-1 --> 1
c    (-b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧ -p_528) -> (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0)
c  in CNF:
c     b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_2
c     b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_1
c     b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨  b^{264, 3}_0
c  in DIMACS:
 23003 -23004  23005  528 -23006 0
 23003 -23004  23005  528 -23007 0
 23003 -23004  23005  528  23008 0

c  1-1 --> 0
c    (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0 ∧ -p_528) -> (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧ -b^{264, 3}_0)
c  in CNF:
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_2
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_1
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_0
c  in DIMACS:
 23003  23004 -23005  528 -23006 0
 23003  23004 -23005  528 -23007 0
 23003  23004 -23005  528 -23008 0

c  0-1 --> -1
c    (-b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧ -p_528) -> ( b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0)
c  in CNF:
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨  b^{264, 3}_2
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_1
c     b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨  b^{264, 3}_0
c  in DIMACS:
 23003  23004  23005  528  23006 0
 23003  23004  23005  528 -23007 0
 23003  23004  23005  528  23008 0

c  -1-1 --> -2
c    ( b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧  b^{264, 2}_0 ∧ -p_528) -> ( b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0)
c  in CNF:
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨  b^{264, 3}_2
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨  b^{264, 3}_1
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨  p_528 ∨ -b^{264, 3}_0
c  in DIMACS:
-23003  23004 -23005  528  23006 0
-23003  23004 -23005  528  23007 0
-23003  23004 -23005  528 -23008 0

c  -2-1 --> break 
c    ( b^{264, 2}_2 ∧  b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧ -p_528) -> break
c  in CNF:
c    -b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨  b^{264, 2}_0 ∨  p_528 ∨ break
c  in DIMACS:
-23003 -23004  23005  528 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{264, 2}_2 ∧ -b^{264, 2}_1 ∧ -b^{264, 2}_0 ∧ true) 
c  in CNF:
c    -b^{264, 2}_2 ∨  b^{264, 2}_1 ∨  b^{264, 2}_0 ∨ false 
c  in DIMACS:
-23003  23004  23005  0

c  3 does not represent an automaton state.
c    -(-b^{264, 2}_2 ∧  b^{264, 2}_1 ∧  b^{264, 2}_0 ∧ true) 
c  in CNF:
c     b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ false 
c  in DIMACS:
 23003 -23004 -23005  0
c  -3 does not represent an automaton state.
c    -( b^{264, 2}_2 ∧  b^{264, 2}_1 ∧  b^{264, 2}_0 ∧ true) 
c  in CNF:
c    -b^{264, 2}_2 ∨ -b^{264, 2}_1 ∨ -b^{264, 2}_0 ∨ false 
c  in DIMACS:
-23003 -23004 -23005  0

c i = 3
c  -2+1 --> -1
c    ( b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧  p_792) -> ( b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0)
c  in CNF:
c    -b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨  b^{264, 4}_2
c    -b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_1
c    -b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨  b^{264, 4}_0
c  in DIMACS:
-23006 -23007  23008 -792  23009 0
-23006 -23007  23008 -792 -23010 0
-23006 -23007  23008 -792  23011 0

c  -1+1 --> 0
c    ( b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0 ∧  p_792) -> (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧ -b^{264, 4}_0)
c  in CNF:
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_2
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_1
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_0
c  in DIMACS:
-23006  23007 -23008 -792 -23009 0
-23006  23007 -23008 -792 -23010 0
-23006  23007 -23008 -792 -23011 0

c  0+1 --> 1
c    (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧  p_792) -> (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0)
c  in CNF:
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_2
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_1
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨  b^{264, 4}_0
c  in DIMACS:
 23006  23007  23008 -792 -23009 0
 23006  23007  23008 -792 -23010 0
 23006  23007  23008 -792  23011 0

c  1+1 --> 2
c    (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0 ∧  p_792) -> (-b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0)
c  in CNF:
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_2
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨  b^{264, 4}_1
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ -p_792 ∨ -b^{264, 4}_0
c  in DIMACS:
 23006  23007 -23008 -792 -23009 0
 23006  23007 -23008 -792  23010 0
 23006  23007 -23008 -792 -23011 0

c  2+1 --> break 
c    (-b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧  p_792) -> break
c  in CNF:
c     b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ -p_792 ∨ break
c  in DIMACS:
 23006 -23007  23008 -792 1162 0


c  2-1 --> 1
c    (-b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧ -p_792) -> (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0)
c  in CNF:
c     b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_2
c     b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_1
c     b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨  b^{264, 4}_0
c  in DIMACS:
 23006 -23007  23008  792 -23009 0
 23006 -23007  23008  792 -23010 0
 23006 -23007  23008  792  23011 0

c  1-1 --> 0
c    (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0 ∧ -p_792) -> (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧ -b^{264, 4}_0)
c  in CNF:
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_2
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_1
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_0
c  in DIMACS:
 23006  23007 -23008  792 -23009 0
 23006  23007 -23008  792 -23010 0
 23006  23007 -23008  792 -23011 0

c  0-1 --> -1
c    (-b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧ -p_792) -> ( b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0)
c  in CNF:
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨  b^{264, 4}_2
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_1
c     b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨  b^{264, 4}_0
c  in DIMACS:
 23006  23007  23008  792  23009 0
 23006  23007  23008  792 -23010 0
 23006  23007  23008  792  23011 0

c  -1-1 --> -2
c    ( b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧  b^{264, 3}_0 ∧ -p_792) -> ( b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0)
c  in CNF:
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨  b^{264, 4}_2
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨  b^{264, 4}_1
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨  p_792 ∨ -b^{264, 4}_0
c  in DIMACS:
-23006  23007 -23008  792  23009 0
-23006  23007 -23008  792  23010 0
-23006  23007 -23008  792 -23011 0

c  -2-1 --> break 
c    ( b^{264, 3}_2 ∧  b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧ -p_792) -> break
c  in CNF:
c    -b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨  b^{264, 3}_0 ∨  p_792 ∨ break
c  in DIMACS:
-23006 -23007  23008  792 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{264, 3}_2 ∧ -b^{264, 3}_1 ∧ -b^{264, 3}_0 ∧ true) 
c  in CNF:
c    -b^{264, 3}_2 ∨  b^{264, 3}_1 ∨  b^{264, 3}_0 ∨ false 
c  in DIMACS:
-23006  23007  23008  0

c  3 does not represent an automaton state.
c    -(-b^{264, 3}_2 ∧  b^{264, 3}_1 ∧  b^{264, 3}_0 ∧ true) 
c  in CNF:
c     b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ false 
c  in DIMACS:
 23006 -23007 -23008  0
c  -3 does not represent an automaton state.
c    -( b^{264, 3}_2 ∧  b^{264, 3}_1 ∧  b^{264, 3}_0 ∧ true) 
c  in CNF:
c    -b^{264, 3}_2 ∨ -b^{264, 3}_1 ∨ -b^{264, 3}_0 ∨ false 
c  in DIMACS:
-23006 -23007 -23008  0

c i = 4
c  -2+1 --> -1
c    ( b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧  p_1056) -> ( b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧  b^{264, 5}_0)
c  in CNF:
c    -b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨  b^{264, 5}_2
c    -b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_1
c    -b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨  b^{264, 5}_0
c  in DIMACS:
-23009 -23010  23011 -1056  23012 0
-23009 -23010  23011 -1056 -23013 0
-23009 -23010  23011 -1056  23014 0

c  -1+1 --> 0
c    ( b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0 ∧  p_1056) -> (-b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧ -b^{264, 5}_0)
c  in CNF:
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_2
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_1
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_0
c  in DIMACS:
-23009  23010 -23011 -1056 -23012 0
-23009  23010 -23011 -1056 -23013 0
-23009  23010 -23011 -1056 -23014 0

c  0+1 --> 1
c    (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧  p_1056) -> (-b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧  b^{264, 5}_0)
c  in CNF:
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_2
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_1
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨  b^{264, 5}_0
c  in DIMACS:
 23009  23010  23011 -1056 -23012 0
 23009  23010  23011 -1056 -23013 0
 23009  23010  23011 -1056  23014 0

c  1+1 --> 2
c    (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0 ∧  p_1056) -> (-b^{264, 5}_2 ∧  b^{264, 5}_1 ∧ -b^{264, 5}_0)
c  in CNF:
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_2
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨  b^{264, 5}_1
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ -p_1056 ∨ -b^{264, 5}_0
c  in DIMACS:
 23009  23010 -23011 -1056 -23012 0
 23009  23010 -23011 -1056  23013 0
 23009  23010 -23011 -1056 -23014 0

c  2+1 --> break 
c    (-b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 23009 -23010  23011 -1056 1162 0


c  2-1 --> 1
c    (-b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧ -p_1056) -> (-b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧  b^{264, 5}_0)
c  in CNF:
c     b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_2
c     b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_1
c     b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨  b^{264, 5}_0
c  in DIMACS:
 23009 -23010  23011  1056 -23012 0
 23009 -23010  23011  1056 -23013 0
 23009 -23010  23011  1056  23014 0

c  1-1 --> 0
c    (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0 ∧ -p_1056) -> (-b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧ -b^{264, 5}_0)
c  in CNF:
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_2
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_1
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_0
c  in DIMACS:
 23009  23010 -23011  1056 -23012 0
 23009  23010 -23011  1056 -23013 0
 23009  23010 -23011  1056 -23014 0

c  0-1 --> -1
c    (-b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧ -p_1056) -> ( b^{264, 5}_2 ∧ -b^{264, 5}_1 ∧  b^{264, 5}_0)
c  in CNF:
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨  b^{264, 5}_2
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_1
c     b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨  b^{264, 5}_0
c  in DIMACS:
 23009  23010  23011  1056  23012 0
 23009  23010  23011  1056 -23013 0
 23009  23010  23011  1056  23014 0

c  -1-1 --> -2
c    ( b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧  b^{264, 4}_0 ∧ -p_1056) -> ( b^{264, 5}_2 ∧  b^{264, 5}_1 ∧ -b^{264, 5}_0)
c  in CNF:
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨  b^{264, 5}_2
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨  b^{264, 5}_1
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨  p_1056 ∨ -b^{264, 5}_0
c  in DIMACS:
-23009  23010 -23011  1056  23012 0
-23009  23010 -23011  1056  23013 0
-23009  23010 -23011  1056 -23014 0

c  -2-1 --> break 
c    ( b^{264, 4}_2 ∧  b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨  b^{264, 4}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-23009 -23010  23011  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{264, 4}_2 ∧ -b^{264, 4}_1 ∧ -b^{264, 4}_0 ∧ true) 
c  in CNF:
c    -b^{264, 4}_2 ∨  b^{264, 4}_1 ∨  b^{264, 4}_0 ∨ false 
c  in DIMACS:
-23009  23010  23011  0

c  3 does not represent an automaton state.
c    -(-b^{264, 4}_2 ∧  b^{264, 4}_1 ∧  b^{264, 4}_0 ∧ true) 
c  in CNF:
c     b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ false 
c  in DIMACS:
 23009 -23010 -23011  0
c  -3 does not represent an automaton state.
c    -( b^{264, 4}_2 ∧  b^{264, 4}_1 ∧  b^{264, 4}_0 ∧ true) 
c  in CNF:
c    -b^{264, 4}_2 ∨ -b^{264, 4}_1 ∨ -b^{264, 4}_0 ∨ false 
c  in DIMACS:
-23009 -23010 -23011  0

c INIT for k = 265
c    -b^{265, 1}_2
c    -b^{265, 1}_1
c    -b^{265, 1}_0
c  in DIMACS:
-23015 0
-23016 0
-23017 0

c Transitions for k = 265
c i = 1
c  -2+1 --> -1
c    ( b^{265, 1}_2 ∧  b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧  p_265) -> ( b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0)
c  in CNF:
c    -b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨  b^{265, 2}_2
c    -b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_1
c    -b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨  b^{265, 2}_0
c  in DIMACS:
-23015 -23016  23017 -265  23018 0
-23015 -23016  23017 -265 -23019 0
-23015 -23016  23017 -265  23020 0

c  -1+1 --> 0
c    ( b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧  b^{265, 1}_0 ∧  p_265) -> (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧ -b^{265, 2}_0)
c  in CNF:
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_2
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_1
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_0
c  in DIMACS:
-23015  23016 -23017 -265 -23018 0
-23015  23016 -23017 -265 -23019 0
-23015  23016 -23017 -265 -23020 0

c  0+1 --> 1
c    (-b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧  p_265) -> (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0)
c  in CNF:
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_2
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_1
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨  b^{265, 2}_0
c  in DIMACS:
 23015  23016  23017 -265 -23018 0
 23015  23016  23017 -265 -23019 0
 23015  23016  23017 -265  23020 0

c  1+1 --> 2
c    (-b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧  b^{265, 1}_0 ∧  p_265) -> (-b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0)
c  in CNF:
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_2
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨  b^{265, 2}_1
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ -p_265 ∨ -b^{265, 2}_0
c  in DIMACS:
 23015  23016 -23017 -265 -23018 0
 23015  23016 -23017 -265  23019 0
 23015  23016 -23017 -265 -23020 0

c  2+1 --> break 
c    (-b^{265, 1}_2 ∧  b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧  p_265) -> break
c  in CNF:
c     b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ -p_265 ∨ break
c  in DIMACS:
 23015 -23016  23017 -265 1162 0


c  2-1 --> 1
c    (-b^{265, 1}_2 ∧  b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧ -p_265) -> (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0)
c  in CNF:
c     b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_2
c     b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_1
c     b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨  b^{265, 2}_0
c  in DIMACS:
 23015 -23016  23017  265 -23018 0
 23015 -23016  23017  265 -23019 0
 23015 -23016  23017  265  23020 0

c  1-1 --> 0
c    (-b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧  b^{265, 1}_0 ∧ -p_265) -> (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧ -b^{265, 2}_0)
c  in CNF:
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_2
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_1
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_0
c  in DIMACS:
 23015  23016 -23017  265 -23018 0
 23015  23016 -23017  265 -23019 0
 23015  23016 -23017  265 -23020 0

c  0-1 --> -1
c    (-b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧ -p_265) -> ( b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0)
c  in CNF:
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨  b^{265, 2}_2
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_1
c     b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨  b^{265, 2}_0
c  in DIMACS:
 23015  23016  23017  265  23018 0
 23015  23016  23017  265 -23019 0
 23015  23016  23017  265  23020 0

c  -1-1 --> -2
c    ( b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧  b^{265, 1}_0 ∧ -p_265) -> ( b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0)
c  in CNF:
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨  b^{265, 2}_2
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨  b^{265, 2}_1
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨  p_265 ∨ -b^{265, 2}_0
c  in DIMACS:
-23015  23016 -23017  265  23018 0
-23015  23016 -23017  265  23019 0
-23015  23016 -23017  265 -23020 0

c  -2-1 --> break 
c    ( b^{265, 1}_2 ∧  b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧ -p_265) -> break
c  in CNF:
c    -b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨  b^{265, 1}_0 ∨  p_265 ∨ break
c  in DIMACS:
-23015 -23016  23017  265 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{265, 1}_2 ∧ -b^{265, 1}_1 ∧ -b^{265, 1}_0 ∧ true) 
c  in CNF:
c    -b^{265, 1}_2 ∨  b^{265, 1}_1 ∨  b^{265, 1}_0 ∨ false 
c  in DIMACS:
-23015  23016  23017  0

c  3 does not represent an automaton state.
c    -(-b^{265, 1}_2 ∧  b^{265, 1}_1 ∧  b^{265, 1}_0 ∧ true) 
c  in CNF:
c     b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ false 
c  in DIMACS:
 23015 -23016 -23017  0
c  -3 does not represent an automaton state.
c    -( b^{265, 1}_2 ∧  b^{265, 1}_1 ∧  b^{265, 1}_0 ∧ true) 
c  in CNF:
c    -b^{265, 1}_2 ∨ -b^{265, 1}_1 ∨ -b^{265, 1}_0 ∨ false 
c  in DIMACS:
-23015 -23016 -23017  0

c i = 2
c  -2+1 --> -1
c    ( b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧  p_530) -> ( b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0)
c  in CNF:
c    -b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨  b^{265, 3}_2
c    -b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_1
c    -b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨  b^{265, 3}_0
c  in DIMACS:
-23018 -23019  23020 -530  23021 0
-23018 -23019  23020 -530 -23022 0
-23018 -23019  23020 -530  23023 0

c  -1+1 --> 0
c    ( b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0 ∧  p_530) -> (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧ -b^{265, 3}_0)
c  in CNF:
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_2
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_1
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_0
c  in DIMACS:
-23018  23019 -23020 -530 -23021 0
-23018  23019 -23020 -530 -23022 0
-23018  23019 -23020 -530 -23023 0

c  0+1 --> 1
c    (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧  p_530) -> (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0)
c  in CNF:
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_2
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_1
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨  b^{265, 3}_0
c  in DIMACS:
 23018  23019  23020 -530 -23021 0
 23018  23019  23020 -530 -23022 0
 23018  23019  23020 -530  23023 0

c  1+1 --> 2
c    (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0 ∧  p_530) -> (-b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0)
c  in CNF:
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_2
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨  b^{265, 3}_1
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ -p_530 ∨ -b^{265, 3}_0
c  in DIMACS:
 23018  23019 -23020 -530 -23021 0
 23018  23019 -23020 -530  23022 0
 23018  23019 -23020 -530 -23023 0

c  2+1 --> break 
c    (-b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧  p_530) -> break
c  in CNF:
c     b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ -p_530 ∨ break
c  in DIMACS:
 23018 -23019  23020 -530 1162 0


c  2-1 --> 1
c    (-b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧ -p_530) -> (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0)
c  in CNF:
c     b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_2
c     b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_1
c     b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨  b^{265, 3}_0
c  in DIMACS:
 23018 -23019  23020  530 -23021 0
 23018 -23019  23020  530 -23022 0
 23018 -23019  23020  530  23023 0

c  1-1 --> 0
c    (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0 ∧ -p_530) -> (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧ -b^{265, 3}_0)
c  in CNF:
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_2
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_1
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_0
c  in DIMACS:
 23018  23019 -23020  530 -23021 0
 23018  23019 -23020  530 -23022 0
 23018  23019 -23020  530 -23023 0

c  0-1 --> -1
c    (-b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧ -p_530) -> ( b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0)
c  in CNF:
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨  b^{265, 3}_2
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_1
c     b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨  b^{265, 3}_0
c  in DIMACS:
 23018  23019  23020  530  23021 0
 23018  23019  23020  530 -23022 0
 23018  23019  23020  530  23023 0

c  -1-1 --> -2
c    ( b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧  b^{265, 2}_0 ∧ -p_530) -> ( b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0)
c  in CNF:
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨  b^{265, 3}_2
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨  b^{265, 3}_1
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨  p_530 ∨ -b^{265, 3}_0
c  in DIMACS:
-23018  23019 -23020  530  23021 0
-23018  23019 -23020  530  23022 0
-23018  23019 -23020  530 -23023 0

c  -2-1 --> break 
c    ( b^{265, 2}_2 ∧  b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧ -p_530) -> break
c  in CNF:
c    -b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨  b^{265, 2}_0 ∨  p_530 ∨ break
c  in DIMACS:
-23018 -23019  23020  530 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{265, 2}_2 ∧ -b^{265, 2}_1 ∧ -b^{265, 2}_0 ∧ true) 
c  in CNF:
c    -b^{265, 2}_2 ∨  b^{265, 2}_1 ∨  b^{265, 2}_0 ∨ false 
c  in DIMACS:
-23018  23019  23020  0

c  3 does not represent an automaton state.
c    -(-b^{265, 2}_2 ∧  b^{265, 2}_1 ∧  b^{265, 2}_0 ∧ true) 
c  in CNF:
c     b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ false 
c  in DIMACS:
 23018 -23019 -23020  0
c  -3 does not represent an automaton state.
c    -( b^{265, 2}_2 ∧  b^{265, 2}_1 ∧  b^{265, 2}_0 ∧ true) 
c  in CNF:
c    -b^{265, 2}_2 ∨ -b^{265, 2}_1 ∨ -b^{265, 2}_0 ∨ false 
c  in DIMACS:
-23018 -23019 -23020  0

c i = 3
c  -2+1 --> -1
c    ( b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧  p_795) -> ( b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0)
c  in CNF:
c    -b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨  b^{265, 4}_2
c    -b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_1
c    -b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨  b^{265, 4}_0
c  in DIMACS:
-23021 -23022  23023 -795  23024 0
-23021 -23022  23023 -795 -23025 0
-23021 -23022  23023 -795  23026 0

c  -1+1 --> 0
c    ( b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0 ∧  p_795) -> (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧ -b^{265, 4}_0)
c  in CNF:
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_2
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_1
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_0
c  in DIMACS:
-23021  23022 -23023 -795 -23024 0
-23021  23022 -23023 -795 -23025 0
-23021  23022 -23023 -795 -23026 0

c  0+1 --> 1
c    (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧  p_795) -> (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0)
c  in CNF:
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_2
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_1
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨  b^{265, 4}_0
c  in DIMACS:
 23021  23022  23023 -795 -23024 0
 23021  23022  23023 -795 -23025 0
 23021  23022  23023 -795  23026 0

c  1+1 --> 2
c    (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0 ∧  p_795) -> (-b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0)
c  in CNF:
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_2
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨  b^{265, 4}_1
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ -p_795 ∨ -b^{265, 4}_0
c  in DIMACS:
 23021  23022 -23023 -795 -23024 0
 23021  23022 -23023 -795  23025 0
 23021  23022 -23023 -795 -23026 0

c  2+1 --> break 
c    (-b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧  p_795) -> break
c  in CNF:
c     b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ -p_795 ∨ break
c  in DIMACS:
 23021 -23022  23023 -795 1162 0


c  2-1 --> 1
c    (-b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧ -p_795) -> (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0)
c  in CNF:
c     b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_2
c     b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_1
c     b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨  b^{265, 4}_0
c  in DIMACS:
 23021 -23022  23023  795 -23024 0
 23021 -23022  23023  795 -23025 0
 23021 -23022  23023  795  23026 0

c  1-1 --> 0
c    (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0 ∧ -p_795) -> (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧ -b^{265, 4}_0)
c  in CNF:
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_2
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_1
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_0
c  in DIMACS:
 23021  23022 -23023  795 -23024 0
 23021  23022 -23023  795 -23025 0
 23021  23022 -23023  795 -23026 0

c  0-1 --> -1
c    (-b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧ -p_795) -> ( b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0)
c  in CNF:
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨  b^{265, 4}_2
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_1
c     b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨  b^{265, 4}_0
c  in DIMACS:
 23021  23022  23023  795  23024 0
 23021  23022  23023  795 -23025 0
 23021  23022  23023  795  23026 0

c  -1-1 --> -2
c    ( b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧  b^{265, 3}_0 ∧ -p_795) -> ( b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0)
c  in CNF:
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨  b^{265, 4}_2
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨  b^{265, 4}_1
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨  p_795 ∨ -b^{265, 4}_0
c  in DIMACS:
-23021  23022 -23023  795  23024 0
-23021  23022 -23023  795  23025 0
-23021  23022 -23023  795 -23026 0

c  -2-1 --> break 
c    ( b^{265, 3}_2 ∧  b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧ -p_795) -> break
c  in CNF:
c    -b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨  b^{265, 3}_0 ∨  p_795 ∨ break
c  in DIMACS:
-23021 -23022  23023  795 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{265, 3}_2 ∧ -b^{265, 3}_1 ∧ -b^{265, 3}_0 ∧ true) 
c  in CNF:
c    -b^{265, 3}_2 ∨  b^{265, 3}_1 ∨  b^{265, 3}_0 ∨ false 
c  in DIMACS:
-23021  23022  23023  0

c  3 does not represent an automaton state.
c    -(-b^{265, 3}_2 ∧  b^{265, 3}_1 ∧  b^{265, 3}_0 ∧ true) 
c  in CNF:
c     b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ false 
c  in DIMACS:
 23021 -23022 -23023  0
c  -3 does not represent an automaton state.
c    -( b^{265, 3}_2 ∧  b^{265, 3}_1 ∧  b^{265, 3}_0 ∧ true) 
c  in CNF:
c    -b^{265, 3}_2 ∨ -b^{265, 3}_1 ∨ -b^{265, 3}_0 ∨ false 
c  in DIMACS:
-23021 -23022 -23023  0

c i = 4
c  -2+1 --> -1
c    ( b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧  p_1060) -> ( b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧  b^{265, 5}_0)
c  in CNF:
c    -b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨  b^{265, 5}_2
c    -b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_1
c    -b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨  b^{265, 5}_0
c  in DIMACS:
-23024 -23025  23026 -1060  23027 0
-23024 -23025  23026 -1060 -23028 0
-23024 -23025  23026 -1060  23029 0

c  -1+1 --> 0
c    ( b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0 ∧  p_1060) -> (-b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧ -b^{265, 5}_0)
c  in CNF:
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_2
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_1
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_0
c  in DIMACS:
-23024  23025 -23026 -1060 -23027 0
-23024  23025 -23026 -1060 -23028 0
-23024  23025 -23026 -1060 -23029 0

c  0+1 --> 1
c    (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧  p_1060) -> (-b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧  b^{265, 5}_0)
c  in CNF:
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_2
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_1
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨  b^{265, 5}_0
c  in DIMACS:
 23024  23025  23026 -1060 -23027 0
 23024  23025  23026 -1060 -23028 0
 23024  23025  23026 -1060  23029 0

c  1+1 --> 2
c    (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0 ∧  p_1060) -> (-b^{265, 5}_2 ∧  b^{265, 5}_1 ∧ -b^{265, 5}_0)
c  in CNF:
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_2
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨  b^{265, 5}_1
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ -p_1060 ∨ -b^{265, 5}_0
c  in DIMACS:
 23024  23025 -23026 -1060 -23027 0
 23024  23025 -23026 -1060  23028 0
 23024  23025 -23026 -1060 -23029 0

c  2+1 --> break 
c    (-b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧  p_1060) -> break
c  in CNF:
c     b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ -p_1060 ∨ break
c  in DIMACS:
 23024 -23025  23026 -1060 1162 0


c  2-1 --> 1
c    (-b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧ -p_1060) -> (-b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧  b^{265, 5}_0)
c  in CNF:
c     b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_2
c     b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_1
c     b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨  b^{265, 5}_0
c  in DIMACS:
 23024 -23025  23026  1060 -23027 0
 23024 -23025  23026  1060 -23028 0
 23024 -23025  23026  1060  23029 0

c  1-1 --> 0
c    (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0 ∧ -p_1060) -> (-b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧ -b^{265, 5}_0)
c  in CNF:
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_2
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_1
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_0
c  in DIMACS:
 23024  23025 -23026  1060 -23027 0
 23024  23025 -23026  1060 -23028 0
 23024  23025 -23026  1060 -23029 0

c  0-1 --> -1
c    (-b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧ -p_1060) -> ( b^{265, 5}_2 ∧ -b^{265, 5}_1 ∧  b^{265, 5}_0)
c  in CNF:
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨  b^{265, 5}_2
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_1
c     b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨  b^{265, 5}_0
c  in DIMACS:
 23024  23025  23026  1060  23027 0
 23024  23025  23026  1060 -23028 0
 23024  23025  23026  1060  23029 0

c  -1-1 --> -2
c    ( b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧  b^{265, 4}_0 ∧ -p_1060) -> ( b^{265, 5}_2 ∧  b^{265, 5}_1 ∧ -b^{265, 5}_0)
c  in CNF:
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨  b^{265, 5}_2
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨  b^{265, 5}_1
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨  p_1060 ∨ -b^{265, 5}_0
c  in DIMACS:
-23024  23025 -23026  1060  23027 0
-23024  23025 -23026  1060  23028 0
-23024  23025 -23026  1060 -23029 0

c  -2-1 --> break 
c    ( b^{265, 4}_2 ∧  b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧ -p_1060) -> break
c  in CNF:
c    -b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨  b^{265, 4}_0 ∨  p_1060 ∨ break
c  in DIMACS:
-23024 -23025  23026  1060 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{265, 4}_2 ∧ -b^{265, 4}_1 ∧ -b^{265, 4}_0 ∧ true) 
c  in CNF:
c    -b^{265, 4}_2 ∨  b^{265, 4}_1 ∨  b^{265, 4}_0 ∨ false 
c  in DIMACS:
-23024  23025  23026  0

c  3 does not represent an automaton state.
c    -(-b^{265, 4}_2 ∧  b^{265, 4}_1 ∧  b^{265, 4}_0 ∧ true) 
c  in CNF:
c     b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ false 
c  in DIMACS:
 23024 -23025 -23026  0
c  -3 does not represent an automaton state.
c    -( b^{265, 4}_2 ∧  b^{265, 4}_1 ∧  b^{265, 4}_0 ∧ true) 
c  in CNF:
c    -b^{265, 4}_2 ∨ -b^{265, 4}_1 ∨ -b^{265, 4}_0 ∨ false 
c  in DIMACS:
-23024 -23025 -23026  0

c INIT for k = 266
c    -b^{266, 1}_2
c    -b^{266, 1}_1
c    -b^{266, 1}_0
c  in DIMACS:
-23030 0
-23031 0
-23032 0

c Transitions for k = 266
c i = 1
c  -2+1 --> -1
c    ( b^{266, 1}_2 ∧  b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧  p_266) -> ( b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0)
c  in CNF:
c    -b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨  b^{266, 2}_2
c    -b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_1
c    -b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨  b^{266, 2}_0
c  in DIMACS:
-23030 -23031  23032 -266  23033 0
-23030 -23031  23032 -266 -23034 0
-23030 -23031  23032 -266  23035 0

c  -1+1 --> 0
c    ( b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧  b^{266, 1}_0 ∧  p_266) -> (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧ -b^{266, 2}_0)
c  in CNF:
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_2
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_1
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_0
c  in DIMACS:
-23030  23031 -23032 -266 -23033 0
-23030  23031 -23032 -266 -23034 0
-23030  23031 -23032 -266 -23035 0

c  0+1 --> 1
c    (-b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧  p_266) -> (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0)
c  in CNF:
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_2
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_1
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨  b^{266, 2}_0
c  in DIMACS:
 23030  23031  23032 -266 -23033 0
 23030  23031  23032 -266 -23034 0
 23030  23031  23032 -266  23035 0

c  1+1 --> 2
c    (-b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧  b^{266, 1}_0 ∧  p_266) -> (-b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0)
c  in CNF:
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_2
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨  b^{266, 2}_1
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ -p_266 ∨ -b^{266, 2}_0
c  in DIMACS:
 23030  23031 -23032 -266 -23033 0
 23030  23031 -23032 -266  23034 0
 23030  23031 -23032 -266 -23035 0

c  2+1 --> break 
c    (-b^{266, 1}_2 ∧  b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧  p_266) -> break
c  in CNF:
c     b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ -p_266 ∨ break
c  in DIMACS:
 23030 -23031  23032 -266 1162 0


c  2-1 --> 1
c    (-b^{266, 1}_2 ∧  b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧ -p_266) -> (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0)
c  in CNF:
c     b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_2
c     b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_1
c     b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨  b^{266, 2}_0
c  in DIMACS:
 23030 -23031  23032  266 -23033 0
 23030 -23031  23032  266 -23034 0
 23030 -23031  23032  266  23035 0

c  1-1 --> 0
c    (-b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧  b^{266, 1}_0 ∧ -p_266) -> (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧ -b^{266, 2}_0)
c  in CNF:
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_2
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_1
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_0
c  in DIMACS:
 23030  23031 -23032  266 -23033 0
 23030  23031 -23032  266 -23034 0
 23030  23031 -23032  266 -23035 0

c  0-1 --> -1
c    (-b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧ -p_266) -> ( b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0)
c  in CNF:
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨  b^{266, 2}_2
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_1
c     b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨  b^{266, 2}_0
c  in DIMACS:
 23030  23031  23032  266  23033 0
 23030  23031  23032  266 -23034 0
 23030  23031  23032  266  23035 0

c  -1-1 --> -2
c    ( b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧  b^{266, 1}_0 ∧ -p_266) -> ( b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0)
c  in CNF:
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨  b^{266, 2}_2
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨  b^{266, 2}_1
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨  p_266 ∨ -b^{266, 2}_0
c  in DIMACS:
-23030  23031 -23032  266  23033 0
-23030  23031 -23032  266  23034 0
-23030  23031 -23032  266 -23035 0

c  -2-1 --> break 
c    ( b^{266, 1}_2 ∧  b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧ -p_266) -> break
c  in CNF:
c    -b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨  b^{266, 1}_0 ∨  p_266 ∨ break
c  in DIMACS:
-23030 -23031  23032  266 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{266, 1}_2 ∧ -b^{266, 1}_1 ∧ -b^{266, 1}_0 ∧ true) 
c  in CNF:
c    -b^{266, 1}_2 ∨  b^{266, 1}_1 ∨  b^{266, 1}_0 ∨ false 
c  in DIMACS:
-23030  23031  23032  0

c  3 does not represent an automaton state.
c    -(-b^{266, 1}_2 ∧  b^{266, 1}_1 ∧  b^{266, 1}_0 ∧ true) 
c  in CNF:
c     b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ false 
c  in DIMACS:
 23030 -23031 -23032  0
c  -3 does not represent an automaton state.
c    -( b^{266, 1}_2 ∧  b^{266, 1}_1 ∧  b^{266, 1}_0 ∧ true) 
c  in CNF:
c    -b^{266, 1}_2 ∨ -b^{266, 1}_1 ∨ -b^{266, 1}_0 ∨ false 
c  in DIMACS:
-23030 -23031 -23032  0

c i = 2
c  -2+1 --> -1
c    ( b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧  p_532) -> ( b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0)
c  in CNF:
c    -b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨  b^{266, 3}_2
c    -b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_1
c    -b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨  b^{266, 3}_0
c  in DIMACS:
-23033 -23034  23035 -532  23036 0
-23033 -23034  23035 -532 -23037 0
-23033 -23034  23035 -532  23038 0

c  -1+1 --> 0
c    ( b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0 ∧  p_532) -> (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧ -b^{266, 3}_0)
c  in CNF:
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_2
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_1
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_0
c  in DIMACS:
-23033  23034 -23035 -532 -23036 0
-23033  23034 -23035 -532 -23037 0
-23033  23034 -23035 -532 -23038 0

c  0+1 --> 1
c    (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧  p_532) -> (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0)
c  in CNF:
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_2
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_1
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨  b^{266, 3}_0
c  in DIMACS:
 23033  23034  23035 -532 -23036 0
 23033  23034  23035 -532 -23037 0
 23033  23034  23035 -532  23038 0

c  1+1 --> 2
c    (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0 ∧  p_532) -> (-b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0)
c  in CNF:
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_2
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨  b^{266, 3}_1
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ -p_532 ∨ -b^{266, 3}_0
c  in DIMACS:
 23033  23034 -23035 -532 -23036 0
 23033  23034 -23035 -532  23037 0
 23033  23034 -23035 -532 -23038 0

c  2+1 --> break 
c    (-b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧  p_532) -> break
c  in CNF:
c     b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ -p_532 ∨ break
c  in DIMACS:
 23033 -23034  23035 -532 1162 0


c  2-1 --> 1
c    (-b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧ -p_532) -> (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0)
c  in CNF:
c     b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_2
c     b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_1
c     b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨  b^{266, 3}_0
c  in DIMACS:
 23033 -23034  23035  532 -23036 0
 23033 -23034  23035  532 -23037 0
 23033 -23034  23035  532  23038 0

c  1-1 --> 0
c    (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0 ∧ -p_532) -> (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧ -b^{266, 3}_0)
c  in CNF:
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_2
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_1
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_0
c  in DIMACS:
 23033  23034 -23035  532 -23036 0
 23033  23034 -23035  532 -23037 0
 23033  23034 -23035  532 -23038 0

c  0-1 --> -1
c    (-b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧ -p_532) -> ( b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0)
c  in CNF:
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨  b^{266, 3}_2
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_1
c     b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨  b^{266, 3}_0
c  in DIMACS:
 23033  23034  23035  532  23036 0
 23033  23034  23035  532 -23037 0
 23033  23034  23035  532  23038 0

c  -1-1 --> -2
c    ( b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧  b^{266, 2}_0 ∧ -p_532) -> ( b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0)
c  in CNF:
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨  b^{266, 3}_2
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨  b^{266, 3}_1
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨  p_532 ∨ -b^{266, 3}_0
c  in DIMACS:
-23033  23034 -23035  532  23036 0
-23033  23034 -23035  532  23037 0
-23033  23034 -23035  532 -23038 0

c  -2-1 --> break 
c    ( b^{266, 2}_2 ∧  b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧ -p_532) -> break
c  in CNF:
c    -b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨  b^{266, 2}_0 ∨  p_532 ∨ break
c  in DIMACS:
-23033 -23034  23035  532 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{266, 2}_2 ∧ -b^{266, 2}_1 ∧ -b^{266, 2}_0 ∧ true) 
c  in CNF:
c    -b^{266, 2}_2 ∨  b^{266, 2}_1 ∨  b^{266, 2}_0 ∨ false 
c  in DIMACS:
-23033  23034  23035  0

c  3 does not represent an automaton state.
c    -(-b^{266, 2}_2 ∧  b^{266, 2}_1 ∧  b^{266, 2}_0 ∧ true) 
c  in CNF:
c     b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ false 
c  in DIMACS:
 23033 -23034 -23035  0
c  -3 does not represent an automaton state.
c    -( b^{266, 2}_2 ∧  b^{266, 2}_1 ∧  b^{266, 2}_0 ∧ true) 
c  in CNF:
c    -b^{266, 2}_2 ∨ -b^{266, 2}_1 ∨ -b^{266, 2}_0 ∨ false 
c  in DIMACS:
-23033 -23034 -23035  0

c i = 3
c  -2+1 --> -1
c    ( b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧  p_798) -> ( b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0)
c  in CNF:
c    -b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨  b^{266, 4}_2
c    -b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_1
c    -b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨  b^{266, 4}_0
c  in DIMACS:
-23036 -23037  23038 -798  23039 0
-23036 -23037  23038 -798 -23040 0
-23036 -23037  23038 -798  23041 0

c  -1+1 --> 0
c    ( b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0 ∧  p_798) -> (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧ -b^{266, 4}_0)
c  in CNF:
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_2
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_1
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_0
c  in DIMACS:
-23036  23037 -23038 -798 -23039 0
-23036  23037 -23038 -798 -23040 0
-23036  23037 -23038 -798 -23041 0

c  0+1 --> 1
c    (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧  p_798) -> (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0)
c  in CNF:
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_2
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_1
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨  b^{266, 4}_0
c  in DIMACS:
 23036  23037  23038 -798 -23039 0
 23036  23037  23038 -798 -23040 0
 23036  23037  23038 -798  23041 0

c  1+1 --> 2
c    (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0 ∧  p_798) -> (-b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0)
c  in CNF:
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_2
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨  b^{266, 4}_1
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ -p_798 ∨ -b^{266, 4}_0
c  in DIMACS:
 23036  23037 -23038 -798 -23039 0
 23036  23037 -23038 -798  23040 0
 23036  23037 -23038 -798 -23041 0

c  2+1 --> break 
c    (-b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧  p_798) -> break
c  in CNF:
c     b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ -p_798 ∨ break
c  in DIMACS:
 23036 -23037  23038 -798 1162 0


c  2-1 --> 1
c    (-b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧ -p_798) -> (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0)
c  in CNF:
c     b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_2
c     b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_1
c     b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨  b^{266, 4}_0
c  in DIMACS:
 23036 -23037  23038  798 -23039 0
 23036 -23037  23038  798 -23040 0
 23036 -23037  23038  798  23041 0

c  1-1 --> 0
c    (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0 ∧ -p_798) -> (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧ -b^{266, 4}_0)
c  in CNF:
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_2
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_1
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_0
c  in DIMACS:
 23036  23037 -23038  798 -23039 0
 23036  23037 -23038  798 -23040 0
 23036  23037 -23038  798 -23041 0

c  0-1 --> -1
c    (-b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧ -p_798) -> ( b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0)
c  in CNF:
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨  b^{266, 4}_2
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_1
c     b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨  b^{266, 4}_0
c  in DIMACS:
 23036  23037  23038  798  23039 0
 23036  23037  23038  798 -23040 0
 23036  23037  23038  798  23041 0

c  -1-1 --> -2
c    ( b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧  b^{266, 3}_0 ∧ -p_798) -> ( b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0)
c  in CNF:
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨  b^{266, 4}_2
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨  b^{266, 4}_1
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨  p_798 ∨ -b^{266, 4}_0
c  in DIMACS:
-23036  23037 -23038  798  23039 0
-23036  23037 -23038  798  23040 0
-23036  23037 -23038  798 -23041 0

c  -2-1 --> break 
c    ( b^{266, 3}_2 ∧  b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧ -p_798) -> break
c  in CNF:
c    -b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨  b^{266, 3}_0 ∨  p_798 ∨ break
c  in DIMACS:
-23036 -23037  23038  798 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{266, 3}_2 ∧ -b^{266, 3}_1 ∧ -b^{266, 3}_0 ∧ true) 
c  in CNF:
c    -b^{266, 3}_2 ∨  b^{266, 3}_1 ∨  b^{266, 3}_0 ∨ false 
c  in DIMACS:
-23036  23037  23038  0

c  3 does not represent an automaton state.
c    -(-b^{266, 3}_2 ∧  b^{266, 3}_1 ∧  b^{266, 3}_0 ∧ true) 
c  in CNF:
c     b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ false 
c  in DIMACS:
 23036 -23037 -23038  0
c  -3 does not represent an automaton state.
c    -( b^{266, 3}_2 ∧  b^{266, 3}_1 ∧  b^{266, 3}_0 ∧ true) 
c  in CNF:
c    -b^{266, 3}_2 ∨ -b^{266, 3}_1 ∨ -b^{266, 3}_0 ∨ false 
c  in DIMACS:
-23036 -23037 -23038  0

c i = 4
c  -2+1 --> -1
c    ( b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧  p_1064) -> ( b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧  b^{266, 5}_0)
c  in CNF:
c    -b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨  b^{266, 5}_2
c    -b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_1
c    -b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨  b^{266, 5}_0
c  in DIMACS:
-23039 -23040  23041 -1064  23042 0
-23039 -23040  23041 -1064 -23043 0
-23039 -23040  23041 -1064  23044 0

c  -1+1 --> 0
c    ( b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0 ∧  p_1064) -> (-b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧ -b^{266, 5}_0)
c  in CNF:
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_2
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_1
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_0
c  in DIMACS:
-23039  23040 -23041 -1064 -23042 0
-23039  23040 -23041 -1064 -23043 0
-23039  23040 -23041 -1064 -23044 0

c  0+1 --> 1
c    (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧  p_1064) -> (-b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧  b^{266, 5}_0)
c  in CNF:
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_2
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_1
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨  b^{266, 5}_0
c  in DIMACS:
 23039  23040  23041 -1064 -23042 0
 23039  23040  23041 -1064 -23043 0
 23039  23040  23041 -1064  23044 0

c  1+1 --> 2
c    (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0 ∧  p_1064) -> (-b^{266, 5}_2 ∧  b^{266, 5}_1 ∧ -b^{266, 5}_0)
c  in CNF:
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_2
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨  b^{266, 5}_1
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ -p_1064 ∨ -b^{266, 5}_0
c  in DIMACS:
 23039  23040 -23041 -1064 -23042 0
 23039  23040 -23041 -1064  23043 0
 23039  23040 -23041 -1064 -23044 0

c  2+1 --> break 
c    (-b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧  p_1064) -> break
c  in CNF:
c     b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ -p_1064 ∨ break
c  in DIMACS:
 23039 -23040  23041 -1064 1162 0


c  2-1 --> 1
c    (-b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧ -p_1064) -> (-b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧  b^{266, 5}_0)
c  in CNF:
c     b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_2
c     b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_1
c     b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨  b^{266, 5}_0
c  in DIMACS:
 23039 -23040  23041  1064 -23042 0
 23039 -23040  23041  1064 -23043 0
 23039 -23040  23041  1064  23044 0

c  1-1 --> 0
c    (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0 ∧ -p_1064) -> (-b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧ -b^{266, 5}_0)
c  in CNF:
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_2
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_1
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_0
c  in DIMACS:
 23039  23040 -23041  1064 -23042 0
 23039  23040 -23041  1064 -23043 0
 23039  23040 -23041  1064 -23044 0

c  0-1 --> -1
c    (-b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧ -p_1064) -> ( b^{266, 5}_2 ∧ -b^{266, 5}_1 ∧  b^{266, 5}_0)
c  in CNF:
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨  b^{266, 5}_2
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_1
c     b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨  b^{266, 5}_0
c  in DIMACS:
 23039  23040  23041  1064  23042 0
 23039  23040  23041  1064 -23043 0
 23039  23040  23041  1064  23044 0

c  -1-1 --> -2
c    ( b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧  b^{266, 4}_0 ∧ -p_1064) -> ( b^{266, 5}_2 ∧  b^{266, 5}_1 ∧ -b^{266, 5}_0)
c  in CNF:
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨  b^{266, 5}_2
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨  b^{266, 5}_1
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨  p_1064 ∨ -b^{266, 5}_0
c  in DIMACS:
-23039  23040 -23041  1064  23042 0
-23039  23040 -23041  1064  23043 0
-23039  23040 -23041  1064 -23044 0

c  -2-1 --> break 
c    ( b^{266, 4}_2 ∧  b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧ -p_1064) -> break
c  in CNF:
c    -b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨  b^{266, 4}_0 ∨  p_1064 ∨ break
c  in DIMACS:
-23039 -23040  23041  1064 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{266, 4}_2 ∧ -b^{266, 4}_1 ∧ -b^{266, 4}_0 ∧ true) 
c  in CNF:
c    -b^{266, 4}_2 ∨  b^{266, 4}_1 ∨  b^{266, 4}_0 ∨ false 
c  in DIMACS:
-23039  23040  23041  0

c  3 does not represent an automaton state.
c    -(-b^{266, 4}_2 ∧  b^{266, 4}_1 ∧  b^{266, 4}_0 ∧ true) 
c  in CNF:
c     b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ false 
c  in DIMACS:
 23039 -23040 -23041  0
c  -3 does not represent an automaton state.
c    -( b^{266, 4}_2 ∧  b^{266, 4}_1 ∧  b^{266, 4}_0 ∧ true) 
c  in CNF:
c    -b^{266, 4}_2 ∨ -b^{266, 4}_1 ∨ -b^{266, 4}_0 ∨ false 
c  in DIMACS:
-23039 -23040 -23041  0

c INIT for k = 267
c    -b^{267, 1}_2
c    -b^{267, 1}_1
c    -b^{267, 1}_0
c  in DIMACS:
-23045 0
-23046 0
-23047 0

c Transitions for k = 267
c i = 1
c  -2+1 --> -1
c    ( b^{267, 1}_2 ∧  b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧  p_267) -> ( b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0)
c  in CNF:
c    -b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨  b^{267, 2}_2
c    -b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_1
c    -b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨  b^{267, 2}_0
c  in DIMACS:
-23045 -23046  23047 -267  23048 0
-23045 -23046  23047 -267 -23049 0
-23045 -23046  23047 -267  23050 0

c  -1+1 --> 0
c    ( b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧  b^{267, 1}_0 ∧  p_267) -> (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧ -b^{267, 2}_0)
c  in CNF:
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_2
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_1
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_0
c  in DIMACS:
-23045  23046 -23047 -267 -23048 0
-23045  23046 -23047 -267 -23049 0
-23045  23046 -23047 -267 -23050 0

c  0+1 --> 1
c    (-b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧  p_267) -> (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0)
c  in CNF:
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_2
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_1
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨  b^{267, 2}_0
c  in DIMACS:
 23045  23046  23047 -267 -23048 0
 23045  23046  23047 -267 -23049 0
 23045  23046  23047 -267  23050 0

c  1+1 --> 2
c    (-b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧  b^{267, 1}_0 ∧  p_267) -> (-b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0)
c  in CNF:
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_2
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨  b^{267, 2}_1
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ -p_267 ∨ -b^{267, 2}_0
c  in DIMACS:
 23045  23046 -23047 -267 -23048 0
 23045  23046 -23047 -267  23049 0
 23045  23046 -23047 -267 -23050 0

c  2+1 --> break 
c    (-b^{267, 1}_2 ∧  b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧  p_267) -> break
c  in CNF:
c     b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ -p_267 ∨ break
c  in DIMACS:
 23045 -23046  23047 -267 1162 0


c  2-1 --> 1
c    (-b^{267, 1}_2 ∧  b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧ -p_267) -> (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0)
c  in CNF:
c     b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_2
c     b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_1
c     b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨  b^{267, 2}_0
c  in DIMACS:
 23045 -23046  23047  267 -23048 0
 23045 -23046  23047  267 -23049 0
 23045 -23046  23047  267  23050 0

c  1-1 --> 0
c    (-b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧  b^{267, 1}_0 ∧ -p_267) -> (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧ -b^{267, 2}_0)
c  in CNF:
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_2
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_1
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_0
c  in DIMACS:
 23045  23046 -23047  267 -23048 0
 23045  23046 -23047  267 -23049 0
 23045  23046 -23047  267 -23050 0

c  0-1 --> -1
c    (-b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧ -p_267) -> ( b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0)
c  in CNF:
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨  b^{267, 2}_2
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_1
c     b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨  b^{267, 2}_0
c  in DIMACS:
 23045  23046  23047  267  23048 0
 23045  23046  23047  267 -23049 0
 23045  23046  23047  267  23050 0

c  -1-1 --> -2
c    ( b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧  b^{267, 1}_0 ∧ -p_267) -> ( b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0)
c  in CNF:
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨  b^{267, 2}_2
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨  b^{267, 2}_1
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨  p_267 ∨ -b^{267, 2}_0
c  in DIMACS:
-23045  23046 -23047  267  23048 0
-23045  23046 -23047  267  23049 0
-23045  23046 -23047  267 -23050 0

c  -2-1 --> break 
c    ( b^{267, 1}_2 ∧  b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧ -p_267) -> break
c  in CNF:
c    -b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨  b^{267, 1}_0 ∨  p_267 ∨ break
c  in DIMACS:
-23045 -23046  23047  267 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{267, 1}_2 ∧ -b^{267, 1}_1 ∧ -b^{267, 1}_0 ∧ true) 
c  in CNF:
c    -b^{267, 1}_2 ∨  b^{267, 1}_1 ∨  b^{267, 1}_0 ∨ false 
c  in DIMACS:
-23045  23046  23047  0

c  3 does not represent an automaton state.
c    -(-b^{267, 1}_2 ∧  b^{267, 1}_1 ∧  b^{267, 1}_0 ∧ true) 
c  in CNF:
c     b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ false 
c  in DIMACS:
 23045 -23046 -23047  0
c  -3 does not represent an automaton state.
c    -( b^{267, 1}_2 ∧  b^{267, 1}_1 ∧  b^{267, 1}_0 ∧ true) 
c  in CNF:
c    -b^{267, 1}_2 ∨ -b^{267, 1}_1 ∨ -b^{267, 1}_0 ∨ false 
c  in DIMACS:
-23045 -23046 -23047  0

c i = 2
c  -2+1 --> -1
c    ( b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧  p_534) -> ( b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0)
c  in CNF:
c    -b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨  b^{267, 3}_2
c    -b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_1
c    -b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨  b^{267, 3}_0
c  in DIMACS:
-23048 -23049  23050 -534  23051 0
-23048 -23049  23050 -534 -23052 0
-23048 -23049  23050 -534  23053 0

c  -1+1 --> 0
c    ( b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0 ∧  p_534) -> (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧ -b^{267, 3}_0)
c  in CNF:
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_2
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_1
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_0
c  in DIMACS:
-23048  23049 -23050 -534 -23051 0
-23048  23049 -23050 -534 -23052 0
-23048  23049 -23050 -534 -23053 0

c  0+1 --> 1
c    (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧  p_534) -> (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0)
c  in CNF:
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_2
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_1
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨  b^{267, 3}_0
c  in DIMACS:
 23048  23049  23050 -534 -23051 0
 23048  23049  23050 -534 -23052 0
 23048  23049  23050 -534  23053 0

c  1+1 --> 2
c    (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0 ∧  p_534) -> (-b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0)
c  in CNF:
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_2
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨  b^{267, 3}_1
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ -p_534 ∨ -b^{267, 3}_0
c  in DIMACS:
 23048  23049 -23050 -534 -23051 0
 23048  23049 -23050 -534  23052 0
 23048  23049 -23050 -534 -23053 0

c  2+1 --> break 
c    (-b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧  p_534) -> break
c  in CNF:
c     b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ -p_534 ∨ break
c  in DIMACS:
 23048 -23049  23050 -534 1162 0


c  2-1 --> 1
c    (-b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧ -p_534) -> (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0)
c  in CNF:
c     b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_2
c     b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_1
c     b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨  b^{267, 3}_0
c  in DIMACS:
 23048 -23049  23050  534 -23051 0
 23048 -23049  23050  534 -23052 0
 23048 -23049  23050  534  23053 0

c  1-1 --> 0
c    (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0 ∧ -p_534) -> (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧ -b^{267, 3}_0)
c  in CNF:
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_2
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_1
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_0
c  in DIMACS:
 23048  23049 -23050  534 -23051 0
 23048  23049 -23050  534 -23052 0
 23048  23049 -23050  534 -23053 0

c  0-1 --> -1
c    (-b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧ -p_534) -> ( b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0)
c  in CNF:
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨  b^{267, 3}_2
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_1
c     b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨  b^{267, 3}_0
c  in DIMACS:
 23048  23049  23050  534  23051 0
 23048  23049  23050  534 -23052 0
 23048  23049  23050  534  23053 0

c  -1-1 --> -2
c    ( b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧  b^{267, 2}_0 ∧ -p_534) -> ( b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0)
c  in CNF:
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨  b^{267, 3}_2
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨  b^{267, 3}_1
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨  p_534 ∨ -b^{267, 3}_0
c  in DIMACS:
-23048  23049 -23050  534  23051 0
-23048  23049 -23050  534  23052 0
-23048  23049 -23050  534 -23053 0

c  -2-1 --> break 
c    ( b^{267, 2}_2 ∧  b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧ -p_534) -> break
c  in CNF:
c    -b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨  b^{267, 2}_0 ∨  p_534 ∨ break
c  in DIMACS:
-23048 -23049  23050  534 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{267, 2}_2 ∧ -b^{267, 2}_1 ∧ -b^{267, 2}_0 ∧ true) 
c  in CNF:
c    -b^{267, 2}_2 ∨  b^{267, 2}_1 ∨  b^{267, 2}_0 ∨ false 
c  in DIMACS:
-23048  23049  23050  0

c  3 does not represent an automaton state.
c    -(-b^{267, 2}_2 ∧  b^{267, 2}_1 ∧  b^{267, 2}_0 ∧ true) 
c  in CNF:
c     b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ false 
c  in DIMACS:
 23048 -23049 -23050  0
c  -3 does not represent an automaton state.
c    -( b^{267, 2}_2 ∧  b^{267, 2}_1 ∧  b^{267, 2}_0 ∧ true) 
c  in CNF:
c    -b^{267, 2}_2 ∨ -b^{267, 2}_1 ∨ -b^{267, 2}_0 ∨ false 
c  in DIMACS:
-23048 -23049 -23050  0

c i = 3
c  -2+1 --> -1
c    ( b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧  p_801) -> ( b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0)
c  in CNF:
c    -b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨  b^{267, 4}_2
c    -b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_1
c    -b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨  b^{267, 4}_0
c  in DIMACS:
-23051 -23052  23053 -801  23054 0
-23051 -23052  23053 -801 -23055 0
-23051 -23052  23053 -801  23056 0

c  -1+1 --> 0
c    ( b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0 ∧  p_801) -> (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧ -b^{267, 4}_0)
c  in CNF:
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_2
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_1
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_0
c  in DIMACS:
-23051  23052 -23053 -801 -23054 0
-23051  23052 -23053 -801 -23055 0
-23051  23052 -23053 -801 -23056 0

c  0+1 --> 1
c    (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧  p_801) -> (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0)
c  in CNF:
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_2
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_1
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨  b^{267, 4}_0
c  in DIMACS:
 23051  23052  23053 -801 -23054 0
 23051  23052  23053 -801 -23055 0
 23051  23052  23053 -801  23056 0

c  1+1 --> 2
c    (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0 ∧  p_801) -> (-b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0)
c  in CNF:
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_2
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨  b^{267, 4}_1
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ -p_801 ∨ -b^{267, 4}_0
c  in DIMACS:
 23051  23052 -23053 -801 -23054 0
 23051  23052 -23053 -801  23055 0
 23051  23052 -23053 -801 -23056 0

c  2+1 --> break 
c    (-b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧  p_801) -> break
c  in CNF:
c     b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ -p_801 ∨ break
c  in DIMACS:
 23051 -23052  23053 -801 1162 0


c  2-1 --> 1
c    (-b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧ -p_801) -> (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0)
c  in CNF:
c     b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_2
c     b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_1
c     b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨  b^{267, 4}_0
c  in DIMACS:
 23051 -23052  23053  801 -23054 0
 23051 -23052  23053  801 -23055 0
 23051 -23052  23053  801  23056 0

c  1-1 --> 0
c    (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0 ∧ -p_801) -> (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧ -b^{267, 4}_0)
c  in CNF:
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_2
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_1
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_0
c  in DIMACS:
 23051  23052 -23053  801 -23054 0
 23051  23052 -23053  801 -23055 0
 23051  23052 -23053  801 -23056 0

c  0-1 --> -1
c    (-b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧ -p_801) -> ( b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0)
c  in CNF:
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨  b^{267, 4}_2
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_1
c     b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨  b^{267, 4}_0
c  in DIMACS:
 23051  23052  23053  801  23054 0
 23051  23052  23053  801 -23055 0
 23051  23052  23053  801  23056 0

c  -1-1 --> -2
c    ( b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧  b^{267, 3}_0 ∧ -p_801) -> ( b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0)
c  in CNF:
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨  b^{267, 4}_2
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨  b^{267, 4}_1
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨  p_801 ∨ -b^{267, 4}_0
c  in DIMACS:
-23051  23052 -23053  801  23054 0
-23051  23052 -23053  801  23055 0
-23051  23052 -23053  801 -23056 0

c  -2-1 --> break 
c    ( b^{267, 3}_2 ∧  b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧ -p_801) -> break
c  in CNF:
c    -b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨  b^{267, 3}_0 ∨  p_801 ∨ break
c  in DIMACS:
-23051 -23052  23053  801 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{267, 3}_2 ∧ -b^{267, 3}_1 ∧ -b^{267, 3}_0 ∧ true) 
c  in CNF:
c    -b^{267, 3}_2 ∨  b^{267, 3}_1 ∨  b^{267, 3}_0 ∨ false 
c  in DIMACS:
-23051  23052  23053  0

c  3 does not represent an automaton state.
c    -(-b^{267, 3}_2 ∧  b^{267, 3}_1 ∧  b^{267, 3}_0 ∧ true) 
c  in CNF:
c     b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ false 
c  in DIMACS:
 23051 -23052 -23053  0
c  -3 does not represent an automaton state.
c    -( b^{267, 3}_2 ∧  b^{267, 3}_1 ∧  b^{267, 3}_0 ∧ true) 
c  in CNF:
c    -b^{267, 3}_2 ∨ -b^{267, 3}_1 ∨ -b^{267, 3}_0 ∨ false 
c  in DIMACS:
-23051 -23052 -23053  0

c i = 4
c  -2+1 --> -1
c    ( b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧  p_1068) -> ( b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧  b^{267, 5}_0)
c  in CNF:
c    -b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨  b^{267, 5}_2
c    -b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_1
c    -b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨  b^{267, 5}_0
c  in DIMACS:
-23054 -23055  23056 -1068  23057 0
-23054 -23055  23056 -1068 -23058 0
-23054 -23055  23056 -1068  23059 0

c  -1+1 --> 0
c    ( b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0 ∧  p_1068) -> (-b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧ -b^{267, 5}_0)
c  in CNF:
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_2
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_1
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_0
c  in DIMACS:
-23054  23055 -23056 -1068 -23057 0
-23054  23055 -23056 -1068 -23058 0
-23054  23055 -23056 -1068 -23059 0

c  0+1 --> 1
c    (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧  p_1068) -> (-b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧  b^{267, 5}_0)
c  in CNF:
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_2
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_1
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨  b^{267, 5}_0
c  in DIMACS:
 23054  23055  23056 -1068 -23057 0
 23054  23055  23056 -1068 -23058 0
 23054  23055  23056 -1068  23059 0

c  1+1 --> 2
c    (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0 ∧  p_1068) -> (-b^{267, 5}_2 ∧  b^{267, 5}_1 ∧ -b^{267, 5}_0)
c  in CNF:
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_2
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨  b^{267, 5}_1
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ -p_1068 ∨ -b^{267, 5}_0
c  in DIMACS:
 23054  23055 -23056 -1068 -23057 0
 23054  23055 -23056 -1068  23058 0
 23054  23055 -23056 -1068 -23059 0

c  2+1 --> break 
c    (-b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 23054 -23055  23056 -1068 1162 0


c  2-1 --> 1
c    (-b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧ -p_1068) -> (-b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧  b^{267, 5}_0)
c  in CNF:
c     b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_2
c     b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_1
c     b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨  b^{267, 5}_0
c  in DIMACS:
 23054 -23055  23056  1068 -23057 0
 23054 -23055  23056  1068 -23058 0
 23054 -23055  23056  1068  23059 0

c  1-1 --> 0
c    (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0 ∧ -p_1068) -> (-b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧ -b^{267, 5}_0)
c  in CNF:
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_2
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_1
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_0
c  in DIMACS:
 23054  23055 -23056  1068 -23057 0
 23054  23055 -23056  1068 -23058 0
 23054  23055 -23056  1068 -23059 0

c  0-1 --> -1
c    (-b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧ -p_1068) -> ( b^{267, 5}_2 ∧ -b^{267, 5}_1 ∧  b^{267, 5}_0)
c  in CNF:
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨  b^{267, 5}_2
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_1
c     b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨  b^{267, 5}_0
c  in DIMACS:
 23054  23055  23056  1068  23057 0
 23054  23055  23056  1068 -23058 0
 23054  23055  23056  1068  23059 0

c  -1-1 --> -2
c    ( b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧  b^{267, 4}_0 ∧ -p_1068) -> ( b^{267, 5}_2 ∧  b^{267, 5}_1 ∧ -b^{267, 5}_0)
c  in CNF:
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨  b^{267, 5}_2
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨  b^{267, 5}_1
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨  p_1068 ∨ -b^{267, 5}_0
c  in DIMACS:
-23054  23055 -23056  1068  23057 0
-23054  23055 -23056  1068  23058 0
-23054  23055 -23056  1068 -23059 0

c  -2-1 --> break 
c    ( b^{267, 4}_2 ∧  b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨  b^{267, 4}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-23054 -23055  23056  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{267, 4}_2 ∧ -b^{267, 4}_1 ∧ -b^{267, 4}_0 ∧ true) 
c  in CNF:
c    -b^{267, 4}_2 ∨  b^{267, 4}_1 ∨  b^{267, 4}_0 ∨ false 
c  in DIMACS:
-23054  23055  23056  0

c  3 does not represent an automaton state.
c    -(-b^{267, 4}_2 ∧  b^{267, 4}_1 ∧  b^{267, 4}_0 ∧ true) 
c  in CNF:
c     b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ false 
c  in DIMACS:
 23054 -23055 -23056  0
c  -3 does not represent an automaton state.
c    -( b^{267, 4}_2 ∧  b^{267, 4}_1 ∧  b^{267, 4}_0 ∧ true) 
c  in CNF:
c    -b^{267, 4}_2 ∨ -b^{267, 4}_1 ∨ -b^{267, 4}_0 ∨ false 
c  in DIMACS:
-23054 -23055 -23056  0

c INIT for k = 268
c    -b^{268, 1}_2
c    -b^{268, 1}_1
c    -b^{268, 1}_0
c  in DIMACS:
-23060 0
-23061 0
-23062 0

c Transitions for k = 268
c i = 1
c  -2+1 --> -1
c    ( b^{268, 1}_2 ∧  b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧  p_268) -> ( b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0)
c  in CNF:
c    -b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨  b^{268, 2}_2
c    -b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_1
c    -b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨  b^{268, 2}_0
c  in DIMACS:
-23060 -23061  23062 -268  23063 0
-23060 -23061  23062 -268 -23064 0
-23060 -23061  23062 -268  23065 0

c  -1+1 --> 0
c    ( b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧  b^{268, 1}_0 ∧  p_268) -> (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧ -b^{268, 2}_0)
c  in CNF:
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_2
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_1
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_0
c  in DIMACS:
-23060  23061 -23062 -268 -23063 0
-23060  23061 -23062 -268 -23064 0
-23060  23061 -23062 -268 -23065 0

c  0+1 --> 1
c    (-b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧  p_268) -> (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0)
c  in CNF:
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_2
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_1
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨  b^{268, 2}_0
c  in DIMACS:
 23060  23061  23062 -268 -23063 0
 23060  23061  23062 -268 -23064 0
 23060  23061  23062 -268  23065 0

c  1+1 --> 2
c    (-b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧  b^{268, 1}_0 ∧  p_268) -> (-b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0)
c  in CNF:
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_2
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨  b^{268, 2}_1
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ -p_268 ∨ -b^{268, 2}_0
c  in DIMACS:
 23060  23061 -23062 -268 -23063 0
 23060  23061 -23062 -268  23064 0
 23060  23061 -23062 -268 -23065 0

c  2+1 --> break 
c    (-b^{268, 1}_2 ∧  b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧  p_268) -> break
c  in CNF:
c     b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ -p_268 ∨ break
c  in DIMACS:
 23060 -23061  23062 -268 1162 0


c  2-1 --> 1
c    (-b^{268, 1}_2 ∧  b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧ -p_268) -> (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0)
c  in CNF:
c     b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_2
c     b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_1
c     b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨  b^{268, 2}_0
c  in DIMACS:
 23060 -23061  23062  268 -23063 0
 23060 -23061  23062  268 -23064 0
 23060 -23061  23062  268  23065 0

c  1-1 --> 0
c    (-b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧  b^{268, 1}_0 ∧ -p_268) -> (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧ -b^{268, 2}_0)
c  in CNF:
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_2
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_1
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_0
c  in DIMACS:
 23060  23061 -23062  268 -23063 0
 23060  23061 -23062  268 -23064 0
 23060  23061 -23062  268 -23065 0

c  0-1 --> -1
c    (-b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧ -p_268) -> ( b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0)
c  in CNF:
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨  b^{268, 2}_2
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_1
c     b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨  b^{268, 2}_0
c  in DIMACS:
 23060  23061  23062  268  23063 0
 23060  23061  23062  268 -23064 0
 23060  23061  23062  268  23065 0

c  -1-1 --> -2
c    ( b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧  b^{268, 1}_0 ∧ -p_268) -> ( b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0)
c  in CNF:
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨  b^{268, 2}_2
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨  b^{268, 2}_1
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨  p_268 ∨ -b^{268, 2}_0
c  in DIMACS:
-23060  23061 -23062  268  23063 0
-23060  23061 -23062  268  23064 0
-23060  23061 -23062  268 -23065 0

c  -2-1 --> break 
c    ( b^{268, 1}_2 ∧  b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧ -p_268) -> break
c  in CNF:
c    -b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨  b^{268, 1}_0 ∨  p_268 ∨ break
c  in DIMACS:
-23060 -23061  23062  268 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{268, 1}_2 ∧ -b^{268, 1}_1 ∧ -b^{268, 1}_0 ∧ true) 
c  in CNF:
c    -b^{268, 1}_2 ∨  b^{268, 1}_1 ∨  b^{268, 1}_0 ∨ false 
c  in DIMACS:
-23060  23061  23062  0

c  3 does not represent an automaton state.
c    -(-b^{268, 1}_2 ∧  b^{268, 1}_1 ∧  b^{268, 1}_0 ∧ true) 
c  in CNF:
c     b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ false 
c  in DIMACS:
 23060 -23061 -23062  0
c  -3 does not represent an automaton state.
c    -( b^{268, 1}_2 ∧  b^{268, 1}_1 ∧  b^{268, 1}_0 ∧ true) 
c  in CNF:
c    -b^{268, 1}_2 ∨ -b^{268, 1}_1 ∨ -b^{268, 1}_0 ∨ false 
c  in DIMACS:
-23060 -23061 -23062  0

c i = 2
c  -2+1 --> -1
c    ( b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧  p_536) -> ( b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0)
c  in CNF:
c    -b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨  b^{268, 3}_2
c    -b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_1
c    -b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨  b^{268, 3}_0
c  in DIMACS:
-23063 -23064  23065 -536  23066 0
-23063 -23064  23065 -536 -23067 0
-23063 -23064  23065 -536  23068 0

c  -1+1 --> 0
c    ( b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0 ∧  p_536) -> (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧ -b^{268, 3}_0)
c  in CNF:
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_2
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_1
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_0
c  in DIMACS:
-23063  23064 -23065 -536 -23066 0
-23063  23064 -23065 -536 -23067 0
-23063  23064 -23065 -536 -23068 0

c  0+1 --> 1
c    (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧  p_536) -> (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0)
c  in CNF:
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_2
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_1
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨  b^{268, 3}_0
c  in DIMACS:
 23063  23064  23065 -536 -23066 0
 23063  23064  23065 -536 -23067 0
 23063  23064  23065 -536  23068 0

c  1+1 --> 2
c    (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0 ∧  p_536) -> (-b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0)
c  in CNF:
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_2
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨  b^{268, 3}_1
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ -p_536 ∨ -b^{268, 3}_0
c  in DIMACS:
 23063  23064 -23065 -536 -23066 0
 23063  23064 -23065 -536  23067 0
 23063  23064 -23065 -536 -23068 0

c  2+1 --> break 
c    (-b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧  p_536) -> break
c  in CNF:
c     b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ -p_536 ∨ break
c  in DIMACS:
 23063 -23064  23065 -536 1162 0


c  2-1 --> 1
c    (-b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧ -p_536) -> (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0)
c  in CNF:
c     b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_2
c     b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_1
c     b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨  b^{268, 3}_0
c  in DIMACS:
 23063 -23064  23065  536 -23066 0
 23063 -23064  23065  536 -23067 0
 23063 -23064  23065  536  23068 0

c  1-1 --> 0
c    (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0 ∧ -p_536) -> (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧ -b^{268, 3}_0)
c  in CNF:
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_2
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_1
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_0
c  in DIMACS:
 23063  23064 -23065  536 -23066 0
 23063  23064 -23065  536 -23067 0
 23063  23064 -23065  536 -23068 0

c  0-1 --> -1
c    (-b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧ -p_536) -> ( b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0)
c  in CNF:
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨  b^{268, 3}_2
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_1
c     b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨  b^{268, 3}_0
c  in DIMACS:
 23063  23064  23065  536  23066 0
 23063  23064  23065  536 -23067 0
 23063  23064  23065  536  23068 0

c  -1-1 --> -2
c    ( b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧  b^{268, 2}_0 ∧ -p_536) -> ( b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0)
c  in CNF:
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨  b^{268, 3}_2
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨  b^{268, 3}_1
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨  p_536 ∨ -b^{268, 3}_0
c  in DIMACS:
-23063  23064 -23065  536  23066 0
-23063  23064 -23065  536  23067 0
-23063  23064 -23065  536 -23068 0

c  -2-1 --> break 
c    ( b^{268, 2}_2 ∧  b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧ -p_536) -> break
c  in CNF:
c    -b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨  b^{268, 2}_0 ∨  p_536 ∨ break
c  in DIMACS:
-23063 -23064  23065  536 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{268, 2}_2 ∧ -b^{268, 2}_1 ∧ -b^{268, 2}_0 ∧ true) 
c  in CNF:
c    -b^{268, 2}_2 ∨  b^{268, 2}_1 ∨  b^{268, 2}_0 ∨ false 
c  in DIMACS:
-23063  23064  23065  0

c  3 does not represent an automaton state.
c    -(-b^{268, 2}_2 ∧  b^{268, 2}_1 ∧  b^{268, 2}_0 ∧ true) 
c  in CNF:
c     b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ false 
c  in DIMACS:
 23063 -23064 -23065  0
c  -3 does not represent an automaton state.
c    -( b^{268, 2}_2 ∧  b^{268, 2}_1 ∧  b^{268, 2}_0 ∧ true) 
c  in CNF:
c    -b^{268, 2}_2 ∨ -b^{268, 2}_1 ∨ -b^{268, 2}_0 ∨ false 
c  in DIMACS:
-23063 -23064 -23065  0

c i = 3
c  -2+1 --> -1
c    ( b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧  p_804) -> ( b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0)
c  in CNF:
c    -b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨  b^{268, 4}_2
c    -b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_1
c    -b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨  b^{268, 4}_0
c  in DIMACS:
-23066 -23067  23068 -804  23069 0
-23066 -23067  23068 -804 -23070 0
-23066 -23067  23068 -804  23071 0

c  -1+1 --> 0
c    ( b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0 ∧  p_804) -> (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧ -b^{268, 4}_0)
c  in CNF:
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_2
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_1
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_0
c  in DIMACS:
-23066  23067 -23068 -804 -23069 0
-23066  23067 -23068 -804 -23070 0
-23066  23067 -23068 -804 -23071 0

c  0+1 --> 1
c    (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧  p_804) -> (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0)
c  in CNF:
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_2
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_1
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨  b^{268, 4}_0
c  in DIMACS:
 23066  23067  23068 -804 -23069 0
 23066  23067  23068 -804 -23070 0
 23066  23067  23068 -804  23071 0

c  1+1 --> 2
c    (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0 ∧  p_804) -> (-b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0)
c  in CNF:
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_2
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨  b^{268, 4}_1
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ -p_804 ∨ -b^{268, 4}_0
c  in DIMACS:
 23066  23067 -23068 -804 -23069 0
 23066  23067 -23068 -804  23070 0
 23066  23067 -23068 -804 -23071 0

c  2+1 --> break 
c    (-b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧  p_804) -> break
c  in CNF:
c     b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ -p_804 ∨ break
c  in DIMACS:
 23066 -23067  23068 -804 1162 0


c  2-1 --> 1
c    (-b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧ -p_804) -> (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0)
c  in CNF:
c     b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_2
c     b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_1
c     b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨  b^{268, 4}_0
c  in DIMACS:
 23066 -23067  23068  804 -23069 0
 23066 -23067  23068  804 -23070 0
 23066 -23067  23068  804  23071 0

c  1-1 --> 0
c    (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0 ∧ -p_804) -> (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧ -b^{268, 4}_0)
c  in CNF:
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_2
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_1
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_0
c  in DIMACS:
 23066  23067 -23068  804 -23069 0
 23066  23067 -23068  804 -23070 0
 23066  23067 -23068  804 -23071 0

c  0-1 --> -1
c    (-b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧ -p_804) -> ( b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0)
c  in CNF:
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨  b^{268, 4}_2
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_1
c     b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨  b^{268, 4}_0
c  in DIMACS:
 23066  23067  23068  804  23069 0
 23066  23067  23068  804 -23070 0
 23066  23067  23068  804  23071 0

c  -1-1 --> -2
c    ( b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧  b^{268, 3}_0 ∧ -p_804) -> ( b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0)
c  in CNF:
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨  b^{268, 4}_2
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨  b^{268, 4}_1
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨  p_804 ∨ -b^{268, 4}_0
c  in DIMACS:
-23066  23067 -23068  804  23069 0
-23066  23067 -23068  804  23070 0
-23066  23067 -23068  804 -23071 0

c  -2-1 --> break 
c    ( b^{268, 3}_2 ∧  b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧ -p_804) -> break
c  in CNF:
c    -b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨  b^{268, 3}_0 ∨  p_804 ∨ break
c  in DIMACS:
-23066 -23067  23068  804 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{268, 3}_2 ∧ -b^{268, 3}_1 ∧ -b^{268, 3}_0 ∧ true) 
c  in CNF:
c    -b^{268, 3}_2 ∨  b^{268, 3}_1 ∨  b^{268, 3}_0 ∨ false 
c  in DIMACS:
-23066  23067  23068  0

c  3 does not represent an automaton state.
c    -(-b^{268, 3}_2 ∧  b^{268, 3}_1 ∧  b^{268, 3}_0 ∧ true) 
c  in CNF:
c     b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ false 
c  in DIMACS:
 23066 -23067 -23068  0
c  -3 does not represent an automaton state.
c    -( b^{268, 3}_2 ∧  b^{268, 3}_1 ∧  b^{268, 3}_0 ∧ true) 
c  in CNF:
c    -b^{268, 3}_2 ∨ -b^{268, 3}_1 ∨ -b^{268, 3}_0 ∨ false 
c  in DIMACS:
-23066 -23067 -23068  0

c i = 4
c  -2+1 --> -1
c    ( b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧  p_1072) -> ( b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧  b^{268, 5}_0)
c  in CNF:
c    -b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨  b^{268, 5}_2
c    -b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_1
c    -b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨  b^{268, 5}_0
c  in DIMACS:
-23069 -23070  23071 -1072  23072 0
-23069 -23070  23071 -1072 -23073 0
-23069 -23070  23071 -1072  23074 0

c  -1+1 --> 0
c    ( b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0 ∧  p_1072) -> (-b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧ -b^{268, 5}_0)
c  in CNF:
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_2
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_1
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_0
c  in DIMACS:
-23069  23070 -23071 -1072 -23072 0
-23069  23070 -23071 -1072 -23073 0
-23069  23070 -23071 -1072 -23074 0

c  0+1 --> 1
c    (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧  p_1072) -> (-b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧  b^{268, 5}_0)
c  in CNF:
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_2
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_1
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨  b^{268, 5}_0
c  in DIMACS:
 23069  23070  23071 -1072 -23072 0
 23069  23070  23071 -1072 -23073 0
 23069  23070  23071 -1072  23074 0

c  1+1 --> 2
c    (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0 ∧  p_1072) -> (-b^{268, 5}_2 ∧  b^{268, 5}_1 ∧ -b^{268, 5}_0)
c  in CNF:
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_2
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨  b^{268, 5}_1
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ -p_1072 ∨ -b^{268, 5}_0
c  in DIMACS:
 23069  23070 -23071 -1072 -23072 0
 23069  23070 -23071 -1072  23073 0
 23069  23070 -23071 -1072 -23074 0

c  2+1 --> break 
c    (-b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧  p_1072) -> break
c  in CNF:
c     b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ -p_1072 ∨ break
c  in DIMACS:
 23069 -23070  23071 -1072 1162 0


c  2-1 --> 1
c    (-b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧ -p_1072) -> (-b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧  b^{268, 5}_0)
c  in CNF:
c     b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_2
c     b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_1
c     b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨  b^{268, 5}_0
c  in DIMACS:
 23069 -23070  23071  1072 -23072 0
 23069 -23070  23071  1072 -23073 0
 23069 -23070  23071  1072  23074 0

c  1-1 --> 0
c    (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0 ∧ -p_1072) -> (-b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧ -b^{268, 5}_0)
c  in CNF:
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_2
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_1
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_0
c  in DIMACS:
 23069  23070 -23071  1072 -23072 0
 23069  23070 -23071  1072 -23073 0
 23069  23070 -23071  1072 -23074 0

c  0-1 --> -1
c    (-b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧ -p_1072) -> ( b^{268, 5}_2 ∧ -b^{268, 5}_1 ∧  b^{268, 5}_0)
c  in CNF:
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨  b^{268, 5}_2
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_1
c     b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨  b^{268, 5}_0
c  in DIMACS:
 23069  23070  23071  1072  23072 0
 23069  23070  23071  1072 -23073 0
 23069  23070  23071  1072  23074 0

c  -1-1 --> -2
c    ( b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧  b^{268, 4}_0 ∧ -p_1072) -> ( b^{268, 5}_2 ∧  b^{268, 5}_1 ∧ -b^{268, 5}_0)
c  in CNF:
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨  b^{268, 5}_2
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨  b^{268, 5}_1
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨  p_1072 ∨ -b^{268, 5}_0
c  in DIMACS:
-23069  23070 -23071  1072  23072 0
-23069  23070 -23071  1072  23073 0
-23069  23070 -23071  1072 -23074 0

c  -2-1 --> break 
c    ( b^{268, 4}_2 ∧  b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧ -p_1072) -> break
c  in CNF:
c    -b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨  b^{268, 4}_0 ∨  p_1072 ∨ break
c  in DIMACS:
-23069 -23070  23071  1072 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{268, 4}_2 ∧ -b^{268, 4}_1 ∧ -b^{268, 4}_0 ∧ true) 
c  in CNF:
c    -b^{268, 4}_2 ∨  b^{268, 4}_1 ∨  b^{268, 4}_0 ∨ false 
c  in DIMACS:
-23069  23070  23071  0

c  3 does not represent an automaton state.
c    -(-b^{268, 4}_2 ∧  b^{268, 4}_1 ∧  b^{268, 4}_0 ∧ true) 
c  in CNF:
c     b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ false 
c  in DIMACS:
 23069 -23070 -23071  0
c  -3 does not represent an automaton state.
c    -( b^{268, 4}_2 ∧  b^{268, 4}_1 ∧  b^{268, 4}_0 ∧ true) 
c  in CNF:
c    -b^{268, 4}_2 ∨ -b^{268, 4}_1 ∨ -b^{268, 4}_0 ∨ false 
c  in DIMACS:
-23069 -23070 -23071  0

c INIT for k = 269
c    -b^{269, 1}_2
c    -b^{269, 1}_1
c    -b^{269, 1}_0
c  in DIMACS:
-23075 0
-23076 0
-23077 0

c Transitions for k = 269
c i = 1
c  -2+1 --> -1
c    ( b^{269, 1}_2 ∧  b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧  p_269) -> ( b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0)
c  in CNF:
c    -b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨  b^{269, 2}_2
c    -b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_1
c    -b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨  b^{269, 2}_0
c  in DIMACS:
-23075 -23076  23077 -269  23078 0
-23075 -23076  23077 -269 -23079 0
-23075 -23076  23077 -269  23080 0

c  -1+1 --> 0
c    ( b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧  b^{269, 1}_0 ∧  p_269) -> (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧ -b^{269, 2}_0)
c  in CNF:
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_2
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_1
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_0
c  in DIMACS:
-23075  23076 -23077 -269 -23078 0
-23075  23076 -23077 -269 -23079 0
-23075  23076 -23077 -269 -23080 0

c  0+1 --> 1
c    (-b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧  p_269) -> (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0)
c  in CNF:
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_2
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_1
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨  b^{269, 2}_0
c  in DIMACS:
 23075  23076  23077 -269 -23078 0
 23075  23076  23077 -269 -23079 0
 23075  23076  23077 -269  23080 0

c  1+1 --> 2
c    (-b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧  b^{269, 1}_0 ∧  p_269) -> (-b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0)
c  in CNF:
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_2
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨  b^{269, 2}_1
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ -p_269 ∨ -b^{269, 2}_0
c  in DIMACS:
 23075  23076 -23077 -269 -23078 0
 23075  23076 -23077 -269  23079 0
 23075  23076 -23077 -269 -23080 0

c  2+1 --> break 
c    (-b^{269, 1}_2 ∧  b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧  p_269) -> break
c  in CNF:
c     b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ -p_269 ∨ break
c  in DIMACS:
 23075 -23076  23077 -269 1162 0


c  2-1 --> 1
c    (-b^{269, 1}_2 ∧  b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧ -p_269) -> (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0)
c  in CNF:
c     b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_2
c     b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_1
c     b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨  b^{269, 2}_0
c  in DIMACS:
 23075 -23076  23077  269 -23078 0
 23075 -23076  23077  269 -23079 0
 23075 -23076  23077  269  23080 0

c  1-1 --> 0
c    (-b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧  b^{269, 1}_0 ∧ -p_269) -> (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧ -b^{269, 2}_0)
c  in CNF:
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_2
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_1
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_0
c  in DIMACS:
 23075  23076 -23077  269 -23078 0
 23075  23076 -23077  269 -23079 0
 23075  23076 -23077  269 -23080 0

c  0-1 --> -1
c    (-b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧ -p_269) -> ( b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0)
c  in CNF:
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨  b^{269, 2}_2
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_1
c     b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨  b^{269, 2}_0
c  in DIMACS:
 23075  23076  23077  269  23078 0
 23075  23076  23077  269 -23079 0
 23075  23076  23077  269  23080 0

c  -1-1 --> -2
c    ( b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧  b^{269, 1}_0 ∧ -p_269) -> ( b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0)
c  in CNF:
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨  b^{269, 2}_2
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨  b^{269, 2}_1
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨  p_269 ∨ -b^{269, 2}_0
c  in DIMACS:
-23075  23076 -23077  269  23078 0
-23075  23076 -23077  269  23079 0
-23075  23076 -23077  269 -23080 0

c  -2-1 --> break 
c    ( b^{269, 1}_2 ∧  b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧ -p_269) -> break
c  in CNF:
c    -b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨  b^{269, 1}_0 ∨  p_269 ∨ break
c  in DIMACS:
-23075 -23076  23077  269 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{269, 1}_2 ∧ -b^{269, 1}_1 ∧ -b^{269, 1}_0 ∧ true) 
c  in CNF:
c    -b^{269, 1}_2 ∨  b^{269, 1}_1 ∨  b^{269, 1}_0 ∨ false 
c  in DIMACS:
-23075  23076  23077  0

c  3 does not represent an automaton state.
c    -(-b^{269, 1}_2 ∧  b^{269, 1}_1 ∧  b^{269, 1}_0 ∧ true) 
c  in CNF:
c     b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ false 
c  in DIMACS:
 23075 -23076 -23077  0
c  -3 does not represent an automaton state.
c    -( b^{269, 1}_2 ∧  b^{269, 1}_1 ∧  b^{269, 1}_0 ∧ true) 
c  in CNF:
c    -b^{269, 1}_2 ∨ -b^{269, 1}_1 ∨ -b^{269, 1}_0 ∨ false 
c  in DIMACS:
-23075 -23076 -23077  0

c i = 2
c  -2+1 --> -1
c    ( b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧  p_538) -> ( b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0)
c  in CNF:
c    -b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨  b^{269, 3}_2
c    -b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_1
c    -b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨  b^{269, 3}_0
c  in DIMACS:
-23078 -23079  23080 -538  23081 0
-23078 -23079  23080 -538 -23082 0
-23078 -23079  23080 -538  23083 0

c  -1+1 --> 0
c    ( b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0 ∧  p_538) -> (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧ -b^{269, 3}_0)
c  in CNF:
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_2
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_1
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_0
c  in DIMACS:
-23078  23079 -23080 -538 -23081 0
-23078  23079 -23080 -538 -23082 0
-23078  23079 -23080 -538 -23083 0

c  0+1 --> 1
c    (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧  p_538) -> (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0)
c  in CNF:
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_2
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_1
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨  b^{269, 3}_0
c  in DIMACS:
 23078  23079  23080 -538 -23081 0
 23078  23079  23080 -538 -23082 0
 23078  23079  23080 -538  23083 0

c  1+1 --> 2
c    (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0 ∧  p_538) -> (-b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0)
c  in CNF:
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_2
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨  b^{269, 3}_1
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ -p_538 ∨ -b^{269, 3}_0
c  in DIMACS:
 23078  23079 -23080 -538 -23081 0
 23078  23079 -23080 -538  23082 0
 23078  23079 -23080 -538 -23083 0

c  2+1 --> break 
c    (-b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧  p_538) -> break
c  in CNF:
c     b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ -p_538 ∨ break
c  in DIMACS:
 23078 -23079  23080 -538 1162 0


c  2-1 --> 1
c    (-b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧ -p_538) -> (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0)
c  in CNF:
c     b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_2
c     b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_1
c     b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨  b^{269, 3}_0
c  in DIMACS:
 23078 -23079  23080  538 -23081 0
 23078 -23079  23080  538 -23082 0
 23078 -23079  23080  538  23083 0

c  1-1 --> 0
c    (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0 ∧ -p_538) -> (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧ -b^{269, 3}_0)
c  in CNF:
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_2
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_1
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_0
c  in DIMACS:
 23078  23079 -23080  538 -23081 0
 23078  23079 -23080  538 -23082 0
 23078  23079 -23080  538 -23083 0

c  0-1 --> -1
c    (-b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧ -p_538) -> ( b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0)
c  in CNF:
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨  b^{269, 3}_2
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_1
c     b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨  b^{269, 3}_0
c  in DIMACS:
 23078  23079  23080  538  23081 0
 23078  23079  23080  538 -23082 0
 23078  23079  23080  538  23083 0

c  -1-1 --> -2
c    ( b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧  b^{269, 2}_0 ∧ -p_538) -> ( b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0)
c  in CNF:
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨  b^{269, 3}_2
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨  b^{269, 3}_1
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨  p_538 ∨ -b^{269, 3}_0
c  in DIMACS:
-23078  23079 -23080  538  23081 0
-23078  23079 -23080  538  23082 0
-23078  23079 -23080  538 -23083 0

c  -2-1 --> break 
c    ( b^{269, 2}_2 ∧  b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧ -p_538) -> break
c  in CNF:
c    -b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨  b^{269, 2}_0 ∨  p_538 ∨ break
c  in DIMACS:
-23078 -23079  23080  538 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{269, 2}_2 ∧ -b^{269, 2}_1 ∧ -b^{269, 2}_0 ∧ true) 
c  in CNF:
c    -b^{269, 2}_2 ∨  b^{269, 2}_1 ∨  b^{269, 2}_0 ∨ false 
c  in DIMACS:
-23078  23079  23080  0

c  3 does not represent an automaton state.
c    -(-b^{269, 2}_2 ∧  b^{269, 2}_1 ∧  b^{269, 2}_0 ∧ true) 
c  in CNF:
c     b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ false 
c  in DIMACS:
 23078 -23079 -23080  0
c  -3 does not represent an automaton state.
c    -( b^{269, 2}_2 ∧  b^{269, 2}_1 ∧  b^{269, 2}_0 ∧ true) 
c  in CNF:
c    -b^{269, 2}_2 ∨ -b^{269, 2}_1 ∨ -b^{269, 2}_0 ∨ false 
c  in DIMACS:
-23078 -23079 -23080  0

c i = 3
c  -2+1 --> -1
c    ( b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧  p_807) -> ( b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0)
c  in CNF:
c    -b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨  b^{269, 4}_2
c    -b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_1
c    -b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨  b^{269, 4}_0
c  in DIMACS:
-23081 -23082  23083 -807  23084 0
-23081 -23082  23083 -807 -23085 0
-23081 -23082  23083 -807  23086 0

c  -1+1 --> 0
c    ( b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0 ∧  p_807) -> (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧ -b^{269, 4}_0)
c  in CNF:
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_2
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_1
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_0
c  in DIMACS:
-23081  23082 -23083 -807 -23084 0
-23081  23082 -23083 -807 -23085 0
-23081  23082 -23083 -807 -23086 0

c  0+1 --> 1
c    (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧  p_807) -> (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0)
c  in CNF:
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_2
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_1
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨  b^{269, 4}_0
c  in DIMACS:
 23081  23082  23083 -807 -23084 0
 23081  23082  23083 -807 -23085 0
 23081  23082  23083 -807  23086 0

c  1+1 --> 2
c    (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0 ∧  p_807) -> (-b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0)
c  in CNF:
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_2
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨  b^{269, 4}_1
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ -p_807 ∨ -b^{269, 4}_0
c  in DIMACS:
 23081  23082 -23083 -807 -23084 0
 23081  23082 -23083 -807  23085 0
 23081  23082 -23083 -807 -23086 0

c  2+1 --> break 
c    (-b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧  p_807) -> break
c  in CNF:
c     b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ -p_807 ∨ break
c  in DIMACS:
 23081 -23082  23083 -807 1162 0


c  2-1 --> 1
c    (-b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧ -p_807) -> (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0)
c  in CNF:
c     b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_2
c     b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_1
c     b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨  b^{269, 4}_0
c  in DIMACS:
 23081 -23082  23083  807 -23084 0
 23081 -23082  23083  807 -23085 0
 23081 -23082  23083  807  23086 0

c  1-1 --> 0
c    (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0 ∧ -p_807) -> (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧ -b^{269, 4}_0)
c  in CNF:
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_2
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_1
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_0
c  in DIMACS:
 23081  23082 -23083  807 -23084 0
 23081  23082 -23083  807 -23085 0
 23081  23082 -23083  807 -23086 0

c  0-1 --> -1
c    (-b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧ -p_807) -> ( b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0)
c  in CNF:
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨  b^{269, 4}_2
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_1
c     b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨  b^{269, 4}_0
c  in DIMACS:
 23081  23082  23083  807  23084 0
 23081  23082  23083  807 -23085 0
 23081  23082  23083  807  23086 0

c  -1-1 --> -2
c    ( b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧  b^{269, 3}_0 ∧ -p_807) -> ( b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0)
c  in CNF:
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨  b^{269, 4}_2
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨  b^{269, 4}_1
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨  p_807 ∨ -b^{269, 4}_0
c  in DIMACS:
-23081  23082 -23083  807  23084 0
-23081  23082 -23083  807  23085 0
-23081  23082 -23083  807 -23086 0

c  -2-1 --> break 
c    ( b^{269, 3}_2 ∧  b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧ -p_807) -> break
c  in CNF:
c    -b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨  b^{269, 3}_0 ∨  p_807 ∨ break
c  in DIMACS:
-23081 -23082  23083  807 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{269, 3}_2 ∧ -b^{269, 3}_1 ∧ -b^{269, 3}_0 ∧ true) 
c  in CNF:
c    -b^{269, 3}_2 ∨  b^{269, 3}_1 ∨  b^{269, 3}_0 ∨ false 
c  in DIMACS:
-23081  23082  23083  0

c  3 does not represent an automaton state.
c    -(-b^{269, 3}_2 ∧  b^{269, 3}_1 ∧  b^{269, 3}_0 ∧ true) 
c  in CNF:
c     b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ false 
c  in DIMACS:
 23081 -23082 -23083  0
c  -3 does not represent an automaton state.
c    -( b^{269, 3}_2 ∧  b^{269, 3}_1 ∧  b^{269, 3}_0 ∧ true) 
c  in CNF:
c    -b^{269, 3}_2 ∨ -b^{269, 3}_1 ∨ -b^{269, 3}_0 ∨ false 
c  in DIMACS:
-23081 -23082 -23083  0

c i = 4
c  -2+1 --> -1
c    ( b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧  p_1076) -> ( b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧  b^{269, 5}_0)
c  in CNF:
c    -b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨  b^{269, 5}_2
c    -b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_1
c    -b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨  b^{269, 5}_0
c  in DIMACS:
-23084 -23085  23086 -1076  23087 0
-23084 -23085  23086 -1076 -23088 0
-23084 -23085  23086 -1076  23089 0

c  -1+1 --> 0
c    ( b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0 ∧  p_1076) -> (-b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧ -b^{269, 5}_0)
c  in CNF:
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_2
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_1
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_0
c  in DIMACS:
-23084  23085 -23086 -1076 -23087 0
-23084  23085 -23086 -1076 -23088 0
-23084  23085 -23086 -1076 -23089 0

c  0+1 --> 1
c    (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧  p_1076) -> (-b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧  b^{269, 5}_0)
c  in CNF:
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_2
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_1
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨  b^{269, 5}_0
c  in DIMACS:
 23084  23085  23086 -1076 -23087 0
 23084  23085  23086 -1076 -23088 0
 23084  23085  23086 -1076  23089 0

c  1+1 --> 2
c    (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0 ∧  p_1076) -> (-b^{269, 5}_2 ∧  b^{269, 5}_1 ∧ -b^{269, 5}_0)
c  in CNF:
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_2
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨  b^{269, 5}_1
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ -p_1076 ∨ -b^{269, 5}_0
c  in DIMACS:
 23084  23085 -23086 -1076 -23087 0
 23084  23085 -23086 -1076  23088 0
 23084  23085 -23086 -1076 -23089 0

c  2+1 --> break 
c    (-b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧  p_1076) -> break
c  in CNF:
c     b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ -p_1076 ∨ break
c  in DIMACS:
 23084 -23085  23086 -1076 1162 0


c  2-1 --> 1
c    (-b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧ -p_1076) -> (-b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧  b^{269, 5}_0)
c  in CNF:
c     b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_2
c     b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_1
c     b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨  b^{269, 5}_0
c  in DIMACS:
 23084 -23085  23086  1076 -23087 0
 23084 -23085  23086  1076 -23088 0
 23084 -23085  23086  1076  23089 0

c  1-1 --> 0
c    (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0 ∧ -p_1076) -> (-b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧ -b^{269, 5}_0)
c  in CNF:
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_2
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_1
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_0
c  in DIMACS:
 23084  23085 -23086  1076 -23087 0
 23084  23085 -23086  1076 -23088 0
 23084  23085 -23086  1076 -23089 0

c  0-1 --> -1
c    (-b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧ -p_1076) -> ( b^{269, 5}_2 ∧ -b^{269, 5}_1 ∧  b^{269, 5}_0)
c  in CNF:
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨  b^{269, 5}_2
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_1
c     b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨  b^{269, 5}_0
c  in DIMACS:
 23084  23085  23086  1076  23087 0
 23084  23085  23086  1076 -23088 0
 23084  23085  23086  1076  23089 0

c  -1-1 --> -2
c    ( b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧  b^{269, 4}_0 ∧ -p_1076) -> ( b^{269, 5}_2 ∧  b^{269, 5}_1 ∧ -b^{269, 5}_0)
c  in CNF:
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨  b^{269, 5}_2
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨  b^{269, 5}_1
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨  p_1076 ∨ -b^{269, 5}_0
c  in DIMACS:
-23084  23085 -23086  1076  23087 0
-23084  23085 -23086  1076  23088 0
-23084  23085 -23086  1076 -23089 0

c  -2-1 --> break 
c    ( b^{269, 4}_2 ∧  b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧ -p_1076) -> break
c  in CNF:
c    -b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨  b^{269, 4}_0 ∨  p_1076 ∨ break
c  in DIMACS:
-23084 -23085  23086  1076 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{269, 4}_2 ∧ -b^{269, 4}_1 ∧ -b^{269, 4}_0 ∧ true) 
c  in CNF:
c    -b^{269, 4}_2 ∨  b^{269, 4}_1 ∨  b^{269, 4}_0 ∨ false 
c  in DIMACS:
-23084  23085  23086  0

c  3 does not represent an automaton state.
c    -(-b^{269, 4}_2 ∧  b^{269, 4}_1 ∧  b^{269, 4}_0 ∧ true) 
c  in CNF:
c     b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ false 
c  in DIMACS:
 23084 -23085 -23086  0
c  -3 does not represent an automaton state.
c    -( b^{269, 4}_2 ∧  b^{269, 4}_1 ∧  b^{269, 4}_0 ∧ true) 
c  in CNF:
c    -b^{269, 4}_2 ∨ -b^{269, 4}_1 ∨ -b^{269, 4}_0 ∨ false 
c  in DIMACS:
-23084 -23085 -23086  0

c INIT for k = 270
c    -b^{270, 1}_2
c    -b^{270, 1}_1
c    -b^{270, 1}_0
c  in DIMACS:
-23090 0
-23091 0
-23092 0

c Transitions for k = 270
c i = 1
c  -2+1 --> -1
c    ( b^{270, 1}_2 ∧  b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧  p_270) -> ( b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0)
c  in CNF:
c    -b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨  b^{270, 2}_2
c    -b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_1
c    -b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨  b^{270, 2}_0
c  in DIMACS:
-23090 -23091  23092 -270  23093 0
-23090 -23091  23092 -270 -23094 0
-23090 -23091  23092 -270  23095 0

c  -1+1 --> 0
c    ( b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧  b^{270, 1}_0 ∧  p_270) -> (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧ -b^{270, 2}_0)
c  in CNF:
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_2
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_1
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_0
c  in DIMACS:
-23090  23091 -23092 -270 -23093 0
-23090  23091 -23092 -270 -23094 0
-23090  23091 -23092 -270 -23095 0

c  0+1 --> 1
c    (-b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧  p_270) -> (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0)
c  in CNF:
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_2
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_1
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨  b^{270, 2}_0
c  in DIMACS:
 23090  23091  23092 -270 -23093 0
 23090  23091  23092 -270 -23094 0
 23090  23091  23092 -270  23095 0

c  1+1 --> 2
c    (-b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧  b^{270, 1}_0 ∧  p_270) -> (-b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0)
c  in CNF:
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_2
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨  b^{270, 2}_1
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ -p_270 ∨ -b^{270, 2}_0
c  in DIMACS:
 23090  23091 -23092 -270 -23093 0
 23090  23091 -23092 -270  23094 0
 23090  23091 -23092 -270 -23095 0

c  2+1 --> break 
c    (-b^{270, 1}_2 ∧  b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧  p_270) -> break
c  in CNF:
c     b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ -p_270 ∨ break
c  in DIMACS:
 23090 -23091  23092 -270 1162 0


c  2-1 --> 1
c    (-b^{270, 1}_2 ∧  b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧ -p_270) -> (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0)
c  in CNF:
c     b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_2
c     b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_1
c     b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨  b^{270, 2}_0
c  in DIMACS:
 23090 -23091  23092  270 -23093 0
 23090 -23091  23092  270 -23094 0
 23090 -23091  23092  270  23095 0

c  1-1 --> 0
c    (-b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧  b^{270, 1}_0 ∧ -p_270) -> (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧ -b^{270, 2}_0)
c  in CNF:
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_2
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_1
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_0
c  in DIMACS:
 23090  23091 -23092  270 -23093 0
 23090  23091 -23092  270 -23094 0
 23090  23091 -23092  270 -23095 0

c  0-1 --> -1
c    (-b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧ -p_270) -> ( b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0)
c  in CNF:
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨  b^{270, 2}_2
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_1
c     b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨  b^{270, 2}_0
c  in DIMACS:
 23090  23091  23092  270  23093 0
 23090  23091  23092  270 -23094 0
 23090  23091  23092  270  23095 0

c  -1-1 --> -2
c    ( b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧  b^{270, 1}_0 ∧ -p_270) -> ( b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0)
c  in CNF:
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨  b^{270, 2}_2
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨  b^{270, 2}_1
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨  p_270 ∨ -b^{270, 2}_0
c  in DIMACS:
-23090  23091 -23092  270  23093 0
-23090  23091 -23092  270  23094 0
-23090  23091 -23092  270 -23095 0

c  -2-1 --> break 
c    ( b^{270, 1}_2 ∧  b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧ -p_270) -> break
c  in CNF:
c    -b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨  b^{270, 1}_0 ∨  p_270 ∨ break
c  in DIMACS:
-23090 -23091  23092  270 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{270, 1}_2 ∧ -b^{270, 1}_1 ∧ -b^{270, 1}_0 ∧ true) 
c  in CNF:
c    -b^{270, 1}_2 ∨  b^{270, 1}_1 ∨  b^{270, 1}_0 ∨ false 
c  in DIMACS:
-23090  23091  23092  0

c  3 does not represent an automaton state.
c    -(-b^{270, 1}_2 ∧  b^{270, 1}_1 ∧  b^{270, 1}_0 ∧ true) 
c  in CNF:
c     b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ false 
c  in DIMACS:
 23090 -23091 -23092  0
c  -3 does not represent an automaton state.
c    -( b^{270, 1}_2 ∧  b^{270, 1}_1 ∧  b^{270, 1}_0 ∧ true) 
c  in CNF:
c    -b^{270, 1}_2 ∨ -b^{270, 1}_1 ∨ -b^{270, 1}_0 ∨ false 
c  in DIMACS:
-23090 -23091 -23092  0

c i = 2
c  -2+1 --> -1
c    ( b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧  p_540) -> ( b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0)
c  in CNF:
c    -b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨  b^{270, 3}_2
c    -b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_1
c    -b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨  b^{270, 3}_0
c  in DIMACS:
-23093 -23094  23095 -540  23096 0
-23093 -23094  23095 -540 -23097 0
-23093 -23094  23095 -540  23098 0

c  -1+1 --> 0
c    ( b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0 ∧  p_540) -> (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧ -b^{270, 3}_0)
c  in CNF:
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_2
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_1
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_0
c  in DIMACS:
-23093  23094 -23095 -540 -23096 0
-23093  23094 -23095 -540 -23097 0
-23093  23094 -23095 -540 -23098 0

c  0+1 --> 1
c    (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧  p_540) -> (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0)
c  in CNF:
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_2
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_1
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨  b^{270, 3}_0
c  in DIMACS:
 23093  23094  23095 -540 -23096 0
 23093  23094  23095 -540 -23097 0
 23093  23094  23095 -540  23098 0

c  1+1 --> 2
c    (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0 ∧  p_540) -> (-b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0)
c  in CNF:
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_2
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨  b^{270, 3}_1
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ -p_540 ∨ -b^{270, 3}_0
c  in DIMACS:
 23093  23094 -23095 -540 -23096 0
 23093  23094 -23095 -540  23097 0
 23093  23094 -23095 -540 -23098 0

c  2+1 --> break 
c    (-b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧  p_540) -> break
c  in CNF:
c     b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ -p_540 ∨ break
c  in DIMACS:
 23093 -23094  23095 -540 1162 0


c  2-1 --> 1
c    (-b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧ -p_540) -> (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0)
c  in CNF:
c     b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_2
c     b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_1
c     b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨  b^{270, 3}_0
c  in DIMACS:
 23093 -23094  23095  540 -23096 0
 23093 -23094  23095  540 -23097 0
 23093 -23094  23095  540  23098 0

c  1-1 --> 0
c    (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0 ∧ -p_540) -> (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧ -b^{270, 3}_0)
c  in CNF:
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_2
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_1
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_0
c  in DIMACS:
 23093  23094 -23095  540 -23096 0
 23093  23094 -23095  540 -23097 0
 23093  23094 -23095  540 -23098 0

c  0-1 --> -1
c    (-b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧ -p_540) -> ( b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0)
c  in CNF:
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨  b^{270, 3}_2
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_1
c     b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨  b^{270, 3}_0
c  in DIMACS:
 23093  23094  23095  540  23096 0
 23093  23094  23095  540 -23097 0
 23093  23094  23095  540  23098 0

c  -1-1 --> -2
c    ( b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧  b^{270, 2}_0 ∧ -p_540) -> ( b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0)
c  in CNF:
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨  b^{270, 3}_2
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨  b^{270, 3}_1
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨  p_540 ∨ -b^{270, 3}_0
c  in DIMACS:
-23093  23094 -23095  540  23096 0
-23093  23094 -23095  540  23097 0
-23093  23094 -23095  540 -23098 0

c  -2-1 --> break 
c    ( b^{270, 2}_2 ∧  b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧ -p_540) -> break
c  in CNF:
c    -b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨  b^{270, 2}_0 ∨  p_540 ∨ break
c  in DIMACS:
-23093 -23094  23095  540 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{270, 2}_2 ∧ -b^{270, 2}_1 ∧ -b^{270, 2}_0 ∧ true) 
c  in CNF:
c    -b^{270, 2}_2 ∨  b^{270, 2}_1 ∨  b^{270, 2}_0 ∨ false 
c  in DIMACS:
-23093  23094  23095  0

c  3 does not represent an automaton state.
c    -(-b^{270, 2}_2 ∧  b^{270, 2}_1 ∧  b^{270, 2}_0 ∧ true) 
c  in CNF:
c     b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ false 
c  in DIMACS:
 23093 -23094 -23095  0
c  -3 does not represent an automaton state.
c    -( b^{270, 2}_2 ∧  b^{270, 2}_1 ∧  b^{270, 2}_0 ∧ true) 
c  in CNF:
c    -b^{270, 2}_2 ∨ -b^{270, 2}_1 ∨ -b^{270, 2}_0 ∨ false 
c  in DIMACS:
-23093 -23094 -23095  0

c i = 3
c  -2+1 --> -1
c    ( b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧  p_810) -> ( b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0)
c  in CNF:
c    -b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨  b^{270, 4}_2
c    -b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_1
c    -b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨  b^{270, 4}_0
c  in DIMACS:
-23096 -23097  23098 -810  23099 0
-23096 -23097  23098 -810 -23100 0
-23096 -23097  23098 -810  23101 0

c  -1+1 --> 0
c    ( b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0 ∧  p_810) -> (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧ -b^{270, 4}_0)
c  in CNF:
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_2
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_1
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_0
c  in DIMACS:
-23096  23097 -23098 -810 -23099 0
-23096  23097 -23098 -810 -23100 0
-23096  23097 -23098 -810 -23101 0

c  0+1 --> 1
c    (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧  p_810) -> (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0)
c  in CNF:
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_2
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_1
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨  b^{270, 4}_0
c  in DIMACS:
 23096  23097  23098 -810 -23099 0
 23096  23097  23098 -810 -23100 0
 23096  23097  23098 -810  23101 0

c  1+1 --> 2
c    (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0 ∧  p_810) -> (-b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0)
c  in CNF:
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_2
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨  b^{270, 4}_1
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ -p_810 ∨ -b^{270, 4}_0
c  in DIMACS:
 23096  23097 -23098 -810 -23099 0
 23096  23097 -23098 -810  23100 0
 23096  23097 -23098 -810 -23101 0

c  2+1 --> break 
c    (-b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧  p_810) -> break
c  in CNF:
c     b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ -p_810 ∨ break
c  in DIMACS:
 23096 -23097  23098 -810 1162 0


c  2-1 --> 1
c    (-b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧ -p_810) -> (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0)
c  in CNF:
c     b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_2
c     b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_1
c     b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨  b^{270, 4}_0
c  in DIMACS:
 23096 -23097  23098  810 -23099 0
 23096 -23097  23098  810 -23100 0
 23096 -23097  23098  810  23101 0

c  1-1 --> 0
c    (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0 ∧ -p_810) -> (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧ -b^{270, 4}_0)
c  in CNF:
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_2
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_1
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_0
c  in DIMACS:
 23096  23097 -23098  810 -23099 0
 23096  23097 -23098  810 -23100 0
 23096  23097 -23098  810 -23101 0

c  0-1 --> -1
c    (-b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧ -p_810) -> ( b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0)
c  in CNF:
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨  b^{270, 4}_2
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_1
c     b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨  b^{270, 4}_0
c  in DIMACS:
 23096  23097  23098  810  23099 0
 23096  23097  23098  810 -23100 0
 23096  23097  23098  810  23101 0

c  -1-1 --> -2
c    ( b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧  b^{270, 3}_0 ∧ -p_810) -> ( b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0)
c  in CNF:
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨  b^{270, 4}_2
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨  b^{270, 4}_1
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨  p_810 ∨ -b^{270, 4}_0
c  in DIMACS:
-23096  23097 -23098  810  23099 0
-23096  23097 -23098  810  23100 0
-23096  23097 -23098  810 -23101 0

c  -2-1 --> break 
c    ( b^{270, 3}_2 ∧  b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧ -p_810) -> break
c  in CNF:
c    -b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨  b^{270, 3}_0 ∨  p_810 ∨ break
c  in DIMACS:
-23096 -23097  23098  810 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{270, 3}_2 ∧ -b^{270, 3}_1 ∧ -b^{270, 3}_0 ∧ true) 
c  in CNF:
c    -b^{270, 3}_2 ∨  b^{270, 3}_1 ∨  b^{270, 3}_0 ∨ false 
c  in DIMACS:
-23096  23097  23098  0

c  3 does not represent an automaton state.
c    -(-b^{270, 3}_2 ∧  b^{270, 3}_1 ∧  b^{270, 3}_0 ∧ true) 
c  in CNF:
c     b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ false 
c  in DIMACS:
 23096 -23097 -23098  0
c  -3 does not represent an automaton state.
c    -( b^{270, 3}_2 ∧  b^{270, 3}_1 ∧  b^{270, 3}_0 ∧ true) 
c  in CNF:
c    -b^{270, 3}_2 ∨ -b^{270, 3}_1 ∨ -b^{270, 3}_0 ∨ false 
c  in DIMACS:
-23096 -23097 -23098  0

c i = 4
c  -2+1 --> -1
c    ( b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧  p_1080) -> ( b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧  b^{270, 5}_0)
c  in CNF:
c    -b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨  b^{270, 5}_2
c    -b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_1
c    -b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨  b^{270, 5}_0
c  in DIMACS:
-23099 -23100  23101 -1080  23102 0
-23099 -23100  23101 -1080 -23103 0
-23099 -23100  23101 -1080  23104 0

c  -1+1 --> 0
c    ( b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0 ∧  p_1080) -> (-b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧ -b^{270, 5}_0)
c  in CNF:
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_2
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_1
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_0
c  in DIMACS:
-23099  23100 -23101 -1080 -23102 0
-23099  23100 -23101 -1080 -23103 0
-23099  23100 -23101 -1080 -23104 0

c  0+1 --> 1
c    (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧  p_1080) -> (-b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧  b^{270, 5}_0)
c  in CNF:
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_2
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_1
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨  b^{270, 5}_0
c  in DIMACS:
 23099  23100  23101 -1080 -23102 0
 23099  23100  23101 -1080 -23103 0
 23099  23100  23101 -1080  23104 0

c  1+1 --> 2
c    (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0 ∧  p_1080) -> (-b^{270, 5}_2 ∧  b^{270, 5}_1 ∧ -b^{270, 5}_0)
c  in CNF:
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_2
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨  b^{270, 5}_1
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ -p_1080 ∨ -b^{270, 5}_0
c  in DIMACS:
 23099  23100 -23101 -1080 -23102 0
 23099  23100 -23101 -1080  23103 0
 23099  23100 -23101 -1080 -23104 0

c  2+1 --> break 
c    (-b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 23099 -23100  23101 -1080 1162 0


c  2-1 --> 1
c    (-b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧ -p_1080) -> (-b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧  b^{270, 5}_0)
c  in CNF:
c     b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_2
c     b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_1
c     b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨  b^{270, 5}_0
c  in DIMACS:
 23099 -23100  23101  1080 -23102 0
 23099 -23100  23101  1080 -23103 0
 23099 -23100  23101  1080  23104 0

c  1-1 --> 0
c    (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0 ∧ -p_1080) -> (-b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧ -b^{270, 5}_0)
c  in CNF:
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_2
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_1
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_0
c  in DIMACS:
 23099  23100 -23101  1080 -23102 0
 23099  23100 -23101  1080 -23103 0
 23099  23100 -23101  1080 -23104 0

c  0-1 --> -1
c    (-b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧ -p_1080) -> ( b^{270, 5}_2 ∧ -b^{270, 5}_1 ∧  b^{270, 5}_0)
c  in CNF:
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨  b^{270, 5}_2
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_1
c     b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨  b^{270, 5}_0
c  in DIMACS:
 23099  23100  23101  1080  23102 0
 23099  23100  23101  1080 -23103 0
 23099  23100  23101  1080  23104 0

c  -1-1 --> -2
c    ( b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧  b^{270, 4}_0 ∧ -p_1080) -> ( b^{270, 5}_2 ∧  b^{270, 5}_1 ∧ -b^{270, 5}_0)
c  in CNF:
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨  b^{270, 5}_2
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨  b^{270, 5}_1
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨  p_1080 ∨ -b^{270, 5}_0
c  in DIMACS:
-23099  23100 -23101  1080  23102 0
-23099  23100 -23101  1080  23103 0
-23099  23100 -23101  1080 -23104 0

c  -2-1 --> break 
c    ( b^{270, 4}_2 ∧  b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨  b^{270, 4}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-23099 -23100  23101  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{270, 4}_2 ∧ -b^{270, 4}_1 ∧ -b^{270, 4}_0 ∧ true) 
c  in CNF:
c    -b^{270, 4}_2 ∨  b^{270, 4}_1 ∨  b^{270, 4}_0 ∨ false 
c  in DIMACS:
-23099  23100  23101  0

c  3 does not represent an automaton state.
c    -(-b^{270, 4}_2 ∧  b^{270, 4}_1 ∧  b^{270, 4}_0 ∧ true) 
c  in CNF:
c     b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ false 
c  in DIMACS:
 23099 -23100 -23101  0
c  -3 does not represent an automaton state.
c    -( b^{270, 4}_2 ∧  b^{270, 4}_1 ∧  b^{270, 4}_0 ∧ true) 
c  in CNF:
c    -b^{270, 4}_2 ∨ -b^{270, 4}_1 ∨ -b^{270, 4}_0 ∨ false 
c  in DIMACS:
-23099 -23100 -23101  0

c INIT for k = 271
c    -b^{271, 1}_2
c    -b^{271, 1}_1
c    -b^{271, 1}_0
c  in DIMACS:
-23105 0
-23106 0
-23107 0

c Transitions for k = 271
c i = 1
c  -2+1 --> -1
c    ( b^{271, 1}_2 ∧  b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧  p_271) -> ( b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0)
c  in CNF:
c    -b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨  b^{271, 2}_2
c    -b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_1
c    -b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨  b^{271, 2}_0
c  in DIMACS:
-23105 -23106  23107 -271  23108 0
-23105 -23106  23107 -271 -23109 0
-23105 -23106  23107 -271  23110 0

c  -1+1 --> 0
c    ( b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧  b^{271, 1}_0 ∧  p_271) -> (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧ -b^{271, 2}_0)
c  in CNF:
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_2
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_1
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_0
c  in DIMACS:
-23105  23106 -23107 -271 -23108 0
-23105  23106 -23107 -271 -23109 0
-23105  23106 -23107 -271 -23110 0

c  0+1 --> 1
c    (-b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧  p_271) -> (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0)
c  in CNF:
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_2
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_1
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨  b^{271, 2}_0
c  in DIMACS:
 23105  23106  23107 -271 -23108 0
 23105  23106  23107 -271 -23109 0
 23105  23106  23107 -271  23110 0

c  1+1 --> 2
c    (-b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧  b^{271, 1}_0 ∧  p_271) -> (-b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0)
c  in CNF:
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_2
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨  b^{271, 2}_1
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ -p_271 ∨ -b^{271, 2}_0
c  in DIMACS:
 23105  23106 -23107 -271 -23108 0
 23105  23106 -23107 -271  23109 0
 23105  23106 -23107 -271 -23110 0

c  2+1 --> break 
c    (-b^{271, 1}_2 ∧  b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧  p_271) -> break
c  in CNF:
c     b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ -p_271 ∨ break
c  in DIMACS:
 23105 -23106  23107 -271 1162 0


c  2-1 --> 1
c    (-b^{271, 1}_2 ∧  b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧ -p_271) -> (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0)
c  in CNF:
c     b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_2
c     b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_1
c     b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨  b^{271, 2}_0
c  in DIMACS:
 23105 -23106  23107  271 -23108 0
 23105 -23106  23107  271 -23109 0
 23105 -23106  23107  271  23110 0

c  1-1 --> 0
c    (-b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧  b^{271, 1}_0 ∧ -p_271) -> (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧ -b^{271, 2}_0)
c  in CNF:
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_2
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_1
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_0
c  in DIMACS:
 23105  23106 -23107  271 -23108 0
 23105  23106 -23107  271 -23109 0
 23105  23106 -23107  271 -23110 0

c  0-1 --> -1
c    (-b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧ -p_271) -> ( b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0)
c  in CNF:
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨  b^{271, 2}_2
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_1
c     b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨  b^{271, 2}_0
c  in DIMACS:
 23105  23106  23107  271  23108 0
 23105  23106  23107  271 -23109 0
 23105  23106  23107  271  23110 0

c  -1-1 --> -2
c    ( b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧  b^{271, 1}_0 ∧ -p_271) -> ( b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0)
c  in CNF:
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨  b^{271, 2}_2
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨  b^{271, 2}_1
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨  p_271 ∨ -b^{271, 2}_0
c  in DIMACS:
-23105  23106 -23107  271  23108 0
-23105  23106 -23107  271  23109 0
-23105  23106 -23107  271 -23110 0

c  -2-1 --> break 
c    ( b^{271, 1}_2 ∧  b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧ -p_271) -> break
c  in CNF:
c    -b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨  b^{271, 1}_0 ∨  p_271 ∨ break
c  in DIMACS:
-23105 -23106  23107  271 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{271, 1}_2 ∧ -b^{271, 1}_1 ∧ -b^{271, 1}_0 ∧ true) 
c  in CNF:
c    -b^{271, 1}_2 ∨  b^{271, 1}_1 ∨  b^{271, 1}_0 ∨ false 
c  in DIMACS:
-23105  23106  23107  0

c  3 does not represent an automaton state.
c    -(-b^{271, 1}_2 ∧  b^{271, 1}_1 ∧  b^{271, 1}_0 ∧ true) 
c  in CNF:
c     b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ false 
c  in DIMACS:
 23105 -23106 -23107  0
c  -3 does not represent an automaton state.
c    -( b^{271, 1}_2 ∧  b^{271, 1}_1 ∧  b^{271, 1}_0 ∧ true) 
c  in CNF:
c    -b^{271, 1}_2 ∨ -b^{271, 1}_1 ∨ -b^{271, 1}_0 ∨ false 
c  in DIMACS:
-23105 -23106 -23107  0

c i = 2
c  -2+1 --> -1
c    ( b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧  p_542) -> ( b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0)
c  in CNF:
c    -b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨  b^{271, 3}_2
c    -b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_1
c    -b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨  b^{271, 3}_0
c  in DIMACS:
-23108 -23109  23110 -542  23111 0
-23108 -23109  23110 -542 -23112 0
-23108 -23109  23110 -542  23113 0

c  -1+1 --> 0
c    ( b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0 ∧  p_542) -> (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧ -b^{271, 3}_0)
c  in CNF:
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_2
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_1
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_0
c  in DIMACS:
-23108  23109 -23110 -542 -23111 0
-23108  23109 -23110 -542 -23112 0
-23108  23109 -23110 -542 -23113 0

c  0+1 --> 1
c    (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧  p_542) -> (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0)
c  in CNF:
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_2
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_1
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨  b^{271, 3}_0
c  in DIMACS:
 23108  23109  23110 -542 -23111 0
 23108  23109  23110 -542 -23112 0
 23108  23109  23110 -542  23113 0

c  1+1 --> 2
c    (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0 ∧  p_542) -> (-b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0)
c  in CNF:
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_2
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨  b^{271, 3}_1
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ -p_542 ∨ -b^{271, 3}_0
c  in DIMACS:
 23108  23109 -23110 -542 -23111 0
 23108  23109 -23110 -542  23112 0
 23108  23109 -23110 -542 -23113 0

c  2+1 --> break 
c    (-b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧  p_542) -> break
c  in CNF:
c     b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ -p_542 ∨ break
c  in DIMACS:
 23108 -23109  23110 -542 1162 0


c  2-1 --> 1
c    (-b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧ -p_542) -> (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0)
c  in CNF:
c     b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_2
c     b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_1
c     b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨  b^{271, 3}_0
c  in DIMACS:
 23108 -23109  23110  542 -23111 0
 23108 -23109  23110  542 -23112 0
 23108 -23109  23110  542  23113 0

c  1-1 --> 0
c    (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0 ∧ -p_542) -> (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧ -b^{271, 3}_0)
c  in CNF:
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_2
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_1
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_0
c  in DIMACS:
 23108  23109 -23110  542 -23111 0
 23108  23109 -23110  542 -23112 0
 23108  23109 -23110  542 -23113 0

c  0-1 --> -1
c    (-b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧ -p_542) -> ( b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0)
c  in CNF:
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨  b^{271, 3}_2
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_1
c     b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨  b^{271, 3}_0
c  in DIMACS:
 23108  23109  23110  542  23111 0
 23108  23109  23110  542 -23112 0
 23108  23109  23110  542  23113 0

c  -1-1 --> -2
c    ( b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧  b^{271, 2}_0 ∧ -p_542) -> ( b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0)
c  in CNF:
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨  b^{271, 3}_2
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨  b^{271, 3}_1
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨  p_542 ∨ -b^{271, 3}_0
c  in DIMACS:
-23108  23109 -23110  542  23111 0
-23108  23109 -23110  542  23112 0
-23108  23109 -23110  542 -23113 0

c  -2-1 --> break 
c    ( b^{271, 2}_2 ∧  b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧ -p_542) -> break
c  in CNF:
c    -b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨  b^{271, 2}_0 ∨  p_542 ∨ break
c  in DIMACS:
-23108 -23109  23110  542 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{271, 2}_2 ∧ -b^{271, 2}_1 ∧ -b^{271, 2}_0 ∧ true) 
c  in CNF:
c    -b^{271, 2}_2 ∨  b^{271, 2}_1 ∨  b^{271, 2}_0 ∨ false 
c  in DIMACS:
-23108  23109  23110  0

c  3 does not represent an automaton state.
c    -(-b^{271, 2}_2 ∧  b^{271, 2}_1 ∧  b^{271, 2}_0 ∧ true) 
c  in CNF:
c     b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ false 
c  in DIMACS:
 23108 -23109 -23110  0
c  -3 does not represent an automaton state.
c    -( b^{271, 2}_2 ∧  b^{271, 2}_1 ∧  b^{271, 2}_0 ∧ true) 
c  in CNF:
c    -b^{271, 2}_2 ∨ -b^{271, 2}_1 ∨ -b^{271, 2}_0 ∨ false 
c  in DIMACS:
-23108 -23109 -23110  0

c i = 3
c  -2+1 --> -1
c    ( b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧  p_813) -> ( b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0)
c  in CNF:
c    -b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨  b^{271, 4}_2
c    -b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_1
c    -b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨  b^{271, 4}_0
c  in DIMACS:
-23111 -23112  23113 -813  23114 0
-23111 -23112  23113 -813 -23115 0
-23111 -23112  23113 -813  23116 0

c  -1+1 --> 0
c    ( b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0 ∧  p_813) -> (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧ -b^{271, 4}_0)
c  in CNF:
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_2
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_1
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_0
c  in DIMACS:
-23111  23112 -23113 -813 -23114 0
-23111  23112 -23113 -813 -23115 0
-23111  23112 -23113 -813 -23116 0

c  0+1 --> 1
c    (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧  p_813) -> (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0)
c  in CNF:
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_2
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_1
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨  b^{271, 4}_0
c  in DIMACS:
 23111  23112  23113 -813 -23114 0
 23111  23112  23113 -813 -23115 0
 23111  23112  23113 -813  23116 0

c  1+1 --> 2
c    (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0 ∧  p_813) -> (-b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0)
c  in CNF:
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_2
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨  b^{271, 4}_1
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ -p_813 ∨ -b^{271, 4}_0
c  in DIMACS:
 23111  23112 -23113 -813 -23114 0
 23111  23112 -23113 -813  23115 0
 23111  23112 -23113 -813 -23116 0

c  2+1 --> break 
c    (-b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧  p_813) -> break
c  in CNF:
c     b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ -p_813 ∨ break
c  in DIMACS:
 23111 -23112  23113 -813 1162 0


c  2-1 --> 1
c    (-b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧ -p_813) -> (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0)
c  in CNF:
c     b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_2
c     b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_1
c     b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨  b^{271, 4}_0
c  in DIMACS:
 23111 -23112  23113  813 -23114 0
 23111 -23112  23113  813 -23115 0
 23111 -23112  23113  813  23116 0

c  1-1 --> 0
c    (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0 ∧ -p_813) -> (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧ -b^{271, 4}_0)
c  in CNF:
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_2
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_1
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_0
c  in DIMACS:
 23111  23112 -23113  813 -23114 0
 23111  23112 -23113  813 -23115 0
 23111  23112 -23113  813 -23116 0

c  0-1 --> -1
c    (-b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧ -p_813) -> ( b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0)
c  in CNF:
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨  b^{271, 4}_2
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_1
c     b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨  b^{271, 4}_0
c  in DIMACS:
 23111  23112  23113  813  23114 0
 23111  23112  23113  813 -23115 0
 23111  23112  23113  813  23116 0

c  -1-1 --> -2
c    ( b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧  b^{271, 3}_0 ∧ -p_813) -> ( b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0)
c  in CNF:
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨  b^{271, 4}_2
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨  b^{271, 4}_1
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨  p_813 ∨ -b^{271, 4}_0
c  in DIMACS:
-23111  23112 -23113  813  23114 0
-23111  23112 -23113  813  23115 0
-23111  23112 -23113  813 -23116 0

c  -2-1 --> break 
c    ( b^{271, 3}_2 ∧  b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧ -p_813) -> break
c  in CNF:
c    -b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨  b^{271, 3}_0 ∨  p_813 ∨ break
c  in DIMACS:
-23111 -23112  23113  813 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{271, 3}_2 ∧ -b^{271, 3}_1 ∧ -b^{271, 3}_0 ∧ true) 
c  in CNF:
c    -b^{271, 3}_2 ∨  b^{271, 3}_1 ∨  b^{271, 3}_0 ∨ false 
c  in DIMACS:
-23111  23112  23113  0

c  3 does not represent an automaton state.
c    -(-b^{271, 3}_2 ∧  b^{271, 3}_1 ∧  b^{271, 3}_0 ∧ true) 
c  in CNF:
c     b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ false 
c  in DIMACS:
 23111 -23112 -23113  0
c  -3 does not represent an automaton state.
c    -( b^{271, 3}_2 ∧  b^{271, 3}_1 ∧  b^{271, 3}_0 ∧ true) 
c  in CNF:
c    -b^{271, 3}_2 ∨ -b^{271, 3}_1 ∨ -b^{271, 3}_0 ∨ false 
c  in DIMACS:
-23111 -23112 -23113  0

c i = 4
c  -2+1 --> -1
c    ( b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧  p_1084) -> ( b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧  b^{271, 5}_0)
c  in CNF:
c    -b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨  b^{271, 5}_2
c    -b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_1
c    -b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨  b^{271, 5}_0
c  in DIMACS:
-23114 -23115  23116 -1084  23117 0
-23114 -23115  23116 -1084 -23118 0
-23114 -23115  23116 -1084  23119 0

c  -1+1 --> 0
c    ( b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0 ∧  p_1084) -> (-b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧ -b^{271, 5}_0)
c  in CNF:
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_2
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_1
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_0
c  in DIMACS:
-23114  23115 -23116 -1084 -23117 0
-23114  23115 -23116 -1084 -23118 0
-23114  23115 -23116 -1084 -23119 0

c  0+1 --> 1
c    (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧  p_1084) -> (-b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧  b^{271, 5}_0)
c  in CNF:
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_2
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_1
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨  b^{271, 5}_0
c  in DIMACS:
 23114  23115  23116 -1084 -23117 0
 23114  23115  23116 -1084 -23118 0
 23114  23115  23116 -1084  23119 0

c  1+1 --> 2
c    (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0 ∧  p_1084) -> (-b^{271, 5}_2 ∧  b^{271, 5}_1 ∧ -b^{271, 5}_0)
c  in CNF:
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_2
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨  b^{271, 5}_1
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ -p_1084 ∨ -b^{271, 5}_0
c  in DIMACS:
 23114  23115 -23116 -1084 -23117 0
 23114  23115 -23116 -1084  23118 0
 23114  23115 -23116 -1084 -23119 0

c  2+1 --> break 
c    (-b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧  p_1084) -> break
c  in CNF:
c     b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ -p_1084 ∨ break
c  in DIMACS:
 23114 -23115  23116 -1084 1162 0


c  2-1 --> 1
c    (-b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧ -p_1084) -> (-b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧  b^{271, 5}_0)
c  in CNF:
c     b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_2
c     b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_1
c     b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨  b^{271, 5}_0
c  in DIMACS:
 23114 -23115  23116  1084 -23117 0
 23114 -23115  23116  1084 -23118 0
 23114 -23115  23116  1084  23119 0

c  1-1 --> 0
c    (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0 ∧ -p_1084) -> (-b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧ -b^{271, 5}_0)
c  in CNF:
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_2
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_1
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_0
c  in DIMACS:
 23114  23115 -23116  1084 -23117 0
 23114  23115 -23116  1084 -23118 0
 23114  23115 -23116  1084 -23119 0

c  0-1 --> -1
c    (-b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧ -p_1084) -> ( b^{271, 5}_2 ∧ -b^{271, 5}_1 ∧  b^{271, 5}_0)
c  in CNF:
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨  b^{271, 5}_2
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_1
c     b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨  b^{271, 5}_0
c  in DIMACS:
 23114  23115  23116  1084  23117 0
 23114  23115  23116  1084 -23118 0
 23114  23115  23116  1084  23119 0

c  -1-1 --> -2
c    ( b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧  b^{271, 4}_0 ∧ -p_1084) -> ( b^{271, 5}_2 ∧  b^{271, 5}_1 ∧ -b^{271, 5}_0)
c  in CNF:
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨  b^{271, 5}_2
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨  b^{271, 5}_1
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨  p_1084 ∨ -b^{271, 5}_0
c  in DIMACS:
-23114  23115 -23116  1084  23117 0
-23114  23115 -23116  1084  23118 0
-23114  23115 -23116  1084 -23119 0

c  -2-1 --> break 
c    ( b^{271, 4}_2 ∧  b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧ -p_1084) -> break
c  in CNF:
c    -b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨  b^{271, 4}_0 ∨  p_1084 ∨ break
c  in DIMACS:
-23114 -23115  23116  1084 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{271, 4}_2 ∧ -b^{271, 4}_1 ∧ -b^{271, 4}_0 ∧ true) 
c  in CNF:
c    -b^{271, 4}_2 ∨  b^{271, 4}_1 ∨  b^{271, 4}_0 ∨ false 
c  in DIMACS:
-23114  23115  23116  0

c  3 does not represent an automaton state.
c    -(-b^{271, 4}_2 ∧  b^{271, 4}_1 ∧  b^{271, 4}_0 ∧ true) 
c  in CNF:
c     b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ false 
c  in DIMACS:
 23114 -23115 -23116  0
c  -3 does not represent an automaton state.
c    -( b^{271, 4}_2 ∧  b^{271, 4}_1 ∧  b^{271, 4}_0 ∧ true) 
c  in CNF:
c    -b^{271, 4}_2 ∨ -b^{271, 4}_1 ∨ -b^{271, 4}_0 ∨ false 
c  in DIMACS:
-23114 -23115 -23116  0

c INIT for k = 272
c    -b^{272, 1}_2
c    -b^{272, 1}_1
c    -b^{272, 1}_0
c  in DIMACS:
-23120 0
-23121 0
-23122 0

c Transitions for k = 272
c i = 1
c  -2+1 --> -1
c    ( b^{272, 1}_2 ∧  b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧  p_272) -> ( b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0)
c  in CNF:
c    -b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨  b^{272, 2}_2
c    -b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_1
c    -b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨  b^{272, 2}_0
c  in DIMACS:
-23120 -23121  23122 -272  23123 0
-23120 -23121  23122 -272 -23124 0
-23120 -23121  23122 -272  23125 0

c  -1+1 --> 0
c    ( b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧  b^{272, 1}_0 ∧  p_272) -> (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧ -b^{272, 2}_0)
c  in CNF:
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_2
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_1
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_0
c  in DIMACS:
-23120  23121 -23122 -272 -23123 0
-23120  23121 -23122 -272 -23124 0
-23120  23121 -23122 -272 -23125 0

c  0+1 --> 1
c    (-b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧  p_272) -> (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0)
c  in CNF:
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_2
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_1
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨  b^{272, 2}_0
c  in DIMACS:
 23120  23121  23122 -272 -23123 0
 23120  23121  23122 -272 -23124 0
 23120  23121  23122 -272  23125 0

c  1+1 --> 2
c    (-b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧  b^{272, 1}_0 ∧  p_272) -> (-b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0)
c  in CNF:
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_2
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨  b^{272, 2}_1
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ -p_272 ∨ -b^{272, 2}_0
c  in DIMACS:
 23120  23121 -23122 -272 -23123 0
 23120  23121 -23122 -272  23124 0
 23120  23121 -23122 -272 -23125 0

c  2+1 --> break 
c    (-b^{272, 1}_2 ∧  b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧  p_272) -> break
c  in CNF:
c     b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ -p_272 ∨ break
c  in DIMACS:
 23120 -23121  23122 -272 1162 0


c  2-1 --> 1
c    (-b^{272, 1}_2 ∧  b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧ -p_272) -> (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0)
c  in CNF:
c     b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_2
c     b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_1
c     b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨  b^{272, 2}_0
c  in DIMACS:
 23120 -23121  23122  272 -23123 0
 23120 -23121  23122  272 -23124 0
 23120 -23121  23122  272  23125 0

c  1-1 --> 0
c    (-b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧  b^{272, 1}_0 ∧ -p_272) -> (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧ -b^{272, 2}_0)
c  in CNF:
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_2
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_1
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_0
c  in DIMACS:
 23120  23121 -23122  272 -23123 0
 23120  23121 -23122  272 -23124 0
 23120  23121 -23122  272 -23125 0

c  0-1 --> -1
c    (-b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧ -p_272) -> ( b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0)
c  in CNF:
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨  b^{272, 2}_2
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_1
c     b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨  b^{272, 2}_0
c  in DIMACS:
 23120  23121  23122  272  23123 0
 23120  23121  23122  272 -23124 0
 23120  23121  23122  272  23125 0

c  -1-1 --> -2
c    ( b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧  b^{272, 1}_0 ∧ -p_272) -> ( b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0)
c  in CNF:
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨  b^{272, 2}_2
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨  b^{272, 2}_1
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨  p_272 ∨ -b^{272, 2}_0
c  in DIMACS:
-23120  23121 -23122  272  23123 0
-23120  23121 -23122  272  23124 0
-23120  23121 -23122  272 -23125 0

c  -2-1 --> break 
c    ( b^{272, 1}_2 ∧  b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧ -p_272) -> break
c  in CNF:
c    -b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨  b^{272, 1}_0 ∨  p_272 ∨ break
c  in DIMACS:
-23120 -23121  23122  272 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{272, 1}_2 ∧ -b^{272, 1}_1 ∧ -b^{272, 1}_0 ∧ true) 
c  in CNF:
c    -b^{272, 1}_2 ∨  b^{272, 1}_1 ∨  b^{272, 1}_0 ∨ false 
c  in DIMACS:
-23120  23121  23122  0

c  3 does not represent an automaton state.
c    -(-b^{272, 1}_2 ∧  b^{272, 1}_1 ∧  b^{272, 1}_0 ∧ true) 
c  in CNF:
c     b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ false 
c  in DIMACS:
 23120 -23121 -23122  0
c  -3 does not represent an automaton state.
c    -( b^{272, 1}_2 ∧  b^{272, 1}_1 ∧  b^{272, 1}_0 ∧ true) 
c  in CNF:
c    -b^{272, 1}_2 ∨ -b^{272, 1}_1 ∨ -b^{272, 1}_0 ∨ false 
c  in DIMACS:
-23120 -23121 -23122  0

c i = 2
c  -2+1 --> -1
c    ( b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧  p_544) -> ( b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0)
c  in CNF:
c    -b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨  b^{272, 3}_2
c    -b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_1
c    -b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨  b^{272, 3}_0
c  in DIMACS:
-23123 -23124  23125 -544  23126 0
-23123 -23124  23125 -544 -23127 0
-23123 -23124  23125 -544  23128 0

c  -1+1 --> 0
c    ( b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0 ∧  p_544) -> (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧ -b^{272, 3}_0)
c  in CNF:
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_2
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_1
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_0
c  in DIMACS:
-23123  23124 -23125 -544 -23126 0
-23123  23124 -23125 -544 -23127 0
-23123  23124 -23125 -544 -23128 0

c  0+1 --> 1
c    (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧  p_544) -> (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0)
c  in CNF:
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_2
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_1
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨  b^{272, 3}_0
c  in DIMACS:
 23123  23124  23125 -544 -23126 0
 23123  23124  23125 -544 -23127 0
 23123  23124  23125 -544  23128 0

c  1+1 --> 2
c    (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0 ∧  p_544) -> (-b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0)
c  in CNF:
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_2
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨  b^{272, 3}_1
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ -p_544 ∨ -b^{272, 3}_0
c  in DIMACS:
 23123  23124 -23125 -544 -23126 0
 23123  23124 -23125 -544  23127 0
 23123  23124 -23125 -544 -23128 0

c  2+1 --> break 
c    (-b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧  p_544) -> break
c  in CNF:
c     b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ -p_544 ∨ break
c  in DIMACS:
 23123 -23124  23125 -544 1162 0


c  2-1 --> 1
c    (-b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧ -p_544) -> (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0)
c  in CNF:
c     b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_2
c     b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_1
c     b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨  b^{272, 3}_0
c  in DIMACS:
 23123 -23124  23125  544 -23126 0
 23123 -23124  23125  544 -23127 0
 23123 -23124  23125  544  23128 0

c  1-1 --> 0
c    (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0 ∧ -p_544) -> (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧ -b^{272, 3}_0)
c  in CNF:
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_2
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_1
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_0
c  in DIMACS:
 23123  23124 -23125  544 -23126 0
 23123  23124 -23125  544 -23127 0
 23123  23124 -23125  544 -23128 0

c  0-1 --> -1
c    (-b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧ -p_544) -> ( b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0)
c  in CNF:
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨  b^{272, 3}_2
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_1
c     b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨  b^{272, 3}_0
c  in DIMACS:
 23123  23124  23125  544  23126 0
 23123  23124  23125  544 -23127 0
 23123  23124  23125  544  23128 0

c  -1-1 --> -2
c    ( b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧  b^{272, 2}_0 ∧ -p_544) -> ( b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0)
c  in CNF:
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨  b^{272, 3}_2
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨  b^{272, 3}_1
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨  p_544 ∨ -b^{272, 3}_0
c  in DIMACS:
-23123  23124 -23125  544  23126 0
-23123  23124 -23125  544  23127 0
-23123  23124 -23125  544 -23128 0

c  -2-1 --> break 
c    ( b^{272, 2}_2 ∧  b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧ -p_544) -> break
c  in CNF:
c    -b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨  b^{272, 2}_0 ∨  p_544 ∨ break
c  in DIMACS:
-23123 -23124  23125  544 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{272, 2}_2 ∧ -b^{272, 2}_1 ∧ -b^{272, 2}_0 ∧ true) 
c  in CNF:
c    -b^{272, 2}_2 ∨  b^{272, 2}_1 ∨  b^{272, 2}_0 ∨ false 
c  in DIMACS:
-23123  23124  23125  0

c  3 does not represent an automaton state.
c    -(-b^{272, 2}_2 ∧  b^{272, 2}_1 ∧  b^{272, 2}_0 ∧ true) 
c  in CNF:
c     b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ false 
c  in DIMACS:
 23123 -23124 -23125  0
c  -3 does not represent an automaton state.
c    -( b^{272, 2}_2 ∧  b^{272, 2}_1 ∧  b^{272, 2}_0 ∧ true) 
c  in CNF:
c    -b^{272, 2}_2 ∨ -b^{272, 2}_1 ∨ -b^{272, 2}_0 ∨ false 
c  in DIMACS:
-23123 -23124 -23125  0

c i = 3
c  -2+1 --> -1
c    ( b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧  p_816) -> ( b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0)
c  in CNF:
c    -b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨  b^{272, 4}_2
c    -b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_1
c    -b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨  b^{272, 4}_0
c  in DIMACS:
-23126 -23127  23128 -816  23129 0
-23126 -23127  23128 -816 -23130 0
-23126 -23127  23128 -816  23131 0

c  -1+1 --> 0
c    ( b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0 ∧  p_816) -> (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧ -b^{272, 4}_0)
c  in CNF:
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_2
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_1
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_0
c  in DIMACS:
-23126  23127 -23128 -816 -23129 0
-23126  23127 -23128 -816 -23130 0
-23126  23127 -23128 -816 -23131 0

c  0+1 --> 1
c    (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧  p_816) -> (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0)
c  in CNF:
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_2
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_1
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨  b^{272, 4}_0
c  in DIMACS:
 23126  23127  23128 -816 -23129 0
 23126  23127  23128 -816 -23130 0
 23126  23127  23128 -816  23131 0

c  1+1 --> 2
c    (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0 ∧  p_816) -> (-b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0)
c  in CNF:
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_2
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨  b^{272, 4}_1
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ -p_816 ∨ -b^{272, 4}_0
c  in DIMACS:
 23126  23127 -23128 -816 -23129 0
 23126  23127 -23128 -816  23130 0
 23126  23127 -23128 -816 -23131 0

c  2+1 --> break 
c    (-b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧  p_816) -> break
c  in CNF:
c     b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ -p_816 ∨ break
c  in DIMACS:
 23126 -23127  23128 -816 1162 0


c  2-1 --> 1
c    (-b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧ -p_816) -> (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0)
c  in CNF:
c     b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_2
c     b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_1
c     b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨  b^{272, 4}_0
c  in DIMACS:
 23126 -23127  23128  816 -23129 0
 23126 -23127  23128  816 -23130 0
 23126 -23127  23128  816  23131 0

c  1-1 --> 0
c    (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0 ∧ -p_816) -> (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧ -b^{272, 4}_0)
c  in CNF:
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_2
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_1
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_0
c  in DIMACS:
 23126  23127 -23128  816 -23129 0
 23126  23127 -23128  816 -23130 0
 23126  23127 -23128  816 -23131 0

c  0-1 --> -1
c    (-b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧ -p_816) -> ( b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0)
c  in CNF:
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨  b^{272, 4}_2
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_1
c     b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨  b^{272, 4}_0
c  in DIMACS:
 23126  23127  23128  816  23129 0
 23126  23127  23128  816 -23130 0
 23126  23127  23128  816  23131 0

c  -1-1 --> -2
c    ( b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧  b^{272, 3}_0 ∧ -p_816) -> ( b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0)
c  in CNF:
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨  b^{272, 4}_2
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨  b^{272, 4}_1
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨  p_816 ∨ -b^{272, 4}_0
c  in DIMACS:
-23126  23127 -23128  816  23129 0
-23126  23127 -23128  816  23130 0
-23126  23127 -23128  816 -23131 0

c  -2-1 --> break 
c    ( b^{272, 3}_2 ∧  b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧ -p_816) -> break
c  in CNF:
c    -b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨  b^{272, 3}_0 ∨  p_816 ∨ break
c  in DIMACS:
-23126 -23127  23128  816 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{272, 3}_2 ∧ -b^{272, 3}_1 ∧ -b^{272, 3}_0 ∧ true) 
c  in CNF:
c    -b^{272, 3}_2 ∨  b^{272, 3}_1 ∨  b^{272, 3}_0 ∨ false 
c  in DIMACS:
-23126  23127  23128  0

c  3 does not represent an automaton state.
c    -(-b^{272, 3}_2 ∧  b^{272, 3}_1 ∧  b^{272, 3}_0 ∧ true) 
c  in CNF:
c     b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ false 
c  in DIMACS:
 23126 -23127 -23128  0
c  -3 does not represent an automaton state.
c    -( b^{272, 3}_2 ∧  b^{272, 3}_1 ∧  b^{272, 3}_0 ∧ true) 
c  in CNF:
c    -b^{272, 3}_2 ∨ -b^{272, 3}_1 ∨ -b^{272, 3}_0 ∨ false 
c  in DIMACS:
-23126 -23127 -23128  0

c i = 4
c  -2+1 --> -1
c    ( b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧  p_1088) -> ( b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧  b^{272, 5}_0)
c  in CNF:
c    -b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨  b^{272, 5}_2
c    -b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_1
c    -b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨  b^{272, 5}_0
c  in DIMACS:
-23129 -23130  23131 -1088  23132 0
-23129 -23130  23131 -1088 -23133 0
-23129 -23130  23131 -1088  23134 0

c  -1+1 --> 0
c    ( b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0 ∧  p_1088) -> (-b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧ -b^{272, 5}_0)
c  in CNF:
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_2
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_1
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_0
c  in DIMACS:
-23129  23130 -23131 -1088 -23132 0
-23129  23130 -23131 -1088 -23133 0
-23129  23130 -23131 -1088 -23134 0

c  0+1 --> 1
c    (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧  p_1088) -> (-b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧  b^{272, 5}_0)
c  in CNF:
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_2
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_1
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨  b^{272, 5}_0
c  in DIMACS:
 23129  23130  23131 -1088 -23132 0
 23129  23130  23131 -1088 -23133 0
 23129  23130  23131 -1088  23134 0

c  1+1 --> 2
c    (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0 ∧  p_1088) -> (-b^{272, 5}_2 ∧  b^{272, 5}_1 ∧ -b^{272, 5}_0)
c  in CNF:
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_2
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨  b^{272, 5}_1
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ -p_1088 ∨ -b^{272, 5}_0
c  in DIMACS:
 23129  23130 -23131 -1088 -23132 0
 23129  23130 -23131 -1088  23133 0
 23129  23130 -23131 -1088 -23134 0

c  2+1 --> break 
c    (-b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧  p_1088) -> break
c  in CNF:
c     b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ -p_1088 ∨ break
c  in DIMACS:
 23129 -23130  23131 -1088 1162 0


c  2-1 --> 1
c    (-b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧ -p_1088) -> (-b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧  b^{272, 5}_0)
c  in CNF:
c     b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_2
c     b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_1
c     b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨  b^{272, 5}_0
c  in DIMACS:
 23129 -23130  23131  1088 -23132 0
 23129 -23130  23131  1088 -23133 0
 23129 -23130  23131  1088  23134 0

c  1-1 --> 0
c    (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0 ∧ -p_1088) -> (-b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧ -b^{272, 5}_0)
c  in CNF:
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_2
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_1
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_0
c  in DIMACS:
 23129  23130 -23131  1088 -23132 0
 23129  23130 -23131  1088 -23133 0
 23129  23130 -23131  1088 -23134 0

c  0-1 --> -1
c    (-b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧ -p_1088) -> ( b^{272, 5}_2 ∧ -b^{272, 5}_1 ∧  b^{272, 5}_0)
c  in CNF:
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨  b^{272, 5}_2
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_1
c     b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨  b^{272, 5}_0
c  in DIMACS:
 23129  23130  23131  1088  23132 0
 23129  23130  23131  1088 -23133 0
 23129  23130  23131  1088  23134 0

c  -1-1 --> -2
c    ( b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧  b^{272, 4}_0 ∧ -p_1088) -> ( b^{272, 5}_2 ∧  b^{272, 5}_1 ∧ -b^{272, 5}_0)
c  in CNF:
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨  b^{272, 5}_2
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨  b^{272, 5}_1
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨  p_1088 ∨ -b^{272, 5}_0
c  in DIMACS:
-23129  23130 -23131  1088  23132 0
-23129  23130 -23131  1088  23133 0
-23129  23130 -23131  1088 -23134 0

c  -2-1 --> break 
c    ( b^{272, 4}_2 ∧  b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧ -p_1088) -> break
c  in CNF:
c    -b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨  b^{272, 4}_0 ∨  p_1088 ∨ break
c  in DIMACS:
-23129 -23130  23131  1088 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{272, 4}_2 ∧ -b^{272, 4}_1 ∧ -b^{272, 4}_0 ∧ true) 
c  in CNF:
c    -b^{272, 4}_2 ∨  b^{272, 4}_1 ∨  b^{272, 4}_0 ∨ false 
c  in DIMACS:
-23129  23130  23131  0

c  3 does not represent an automaton state.
c    -(-b^{272, 4}_2 ∧  b^{272, 4}_1 ∧  b^{272, 4}_0 ∧ true) 
c  in CNF:
c     b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ false 
c  in DIMACS:
 23129 -23130 -23131  0
c  -3 does not represent an automaton state.
c    -( b^{272, 4}_2 ∧  b^{272, 4}_1 ∧  b^{272, 4}_0 ∧ true) 
c  in CNF:
c    -b^{272, 4}_2 ∨ -b^{272, 4}_1 ∨ -b^{272, 4}_0 ∨ false 
c  in DIMACS:
-23129 -23130 -23131  0

c INIT for k = 273
c    -b^{273, 1}_2
c    -b^{273, 1}_1
c    -b^{273, 1}_0
c  in DIMACS:
-23135 0
-23136 0
-23137 0

c Transitions for k = 273
c i = 1
c  -2+1 --> -1
c    ( b^{273, 1}_2 ∧  b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧  p_273) -> ( b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0)
c  in CNF:
c    -b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨  b^{273, 2}_2
c    -b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_1
c    -b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨  b^{273, 2}_0
c  in DIMACS:
-23135 -23136  23137 -273  23138 0
-23135 -23136  23137 -273 -23139 0
-23135 -23136  23137 -273  23140 0

c  -1+1 --> 0
c    ( b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧  b^{273, 1}_0 ∧  p_273) -> (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧ -b^{273, 2}_0)
c  in CNF:
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_2
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_1
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_0
c  in DIMACS:
-23135  23136 -23137 -273 -23138 0
-23135  23136 -23137 -273 -23139 0
-23135  23136 -23137 -273 -23140 0

c  0+1 --> 1
c    (-b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧  p_273) -> (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0)
c  in CNF:
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_2
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_1
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨  b^{273, 2}_0
c  in DIMACS:
 23135  23136  23137 -273 -23138 0
 23135  23136  23137 -273 -23139 0
 23135  23136  23137 -273  23140 0

c  1+1 --> 2
c    (-b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧  b^{273, 1}_0 ∧  p_273) -> (-b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0)
c  in CNF:
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_2
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨  b^{273, 2}_1
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ -p_273 ∨ -b^{273, 2}_0
c  in DIMACS:
 23135  23136 -23137 -273 -23138 0
 23135  23136 -23137 -273  23139 0
 23135  23136 -23137 -273 -23140 0

c  2+1 --> break 
c    (-b^{273, 1}_2 ∧  b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧  p_273) -> break
c  in CNF:
c     b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ -p_273 ∨ break
c  in DIMACS:
 23135 -23136  23137 -273 1162 0


c  2-1 --> 1
c    (-b^{273, 1}_2 ∧  b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧ -p_273) -> (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0)
c  in CNF:
c     b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_2
c     b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_1
c     b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨  b^{273, 2}_0
c  in DIMACS:
 23135 -23136  23137  273 -23138 0
 23135 -23136  23137  273 -23139 0
 23135 -23136  23137  273  23140 0

c  1-1 --> 0
c    (-b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧  b^{273, 1}_0 ∧ -p_273) -> (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧ -b^{273, 2}_0)
c  in CNF:
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_2
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_1
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_0
c  in DIMACS:
 23135  23136 -23137  273 -23138 0
 23135  23136 -23137  273 -23139 0
 23135  23136 -23137  273 -23140 0

c  0-1 --> -1
c    (-b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧ -p_273) -> ( b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0)
c  in CNF:
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨  b^{273, 2}_2
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_1
c     b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨  b^{273, 2}_0
c  in DIMACS:
 23135  23136  23137  273  23138 0
 23135  23136  23137  273 -23139 0
 23135  23136  23137  273  23140 0

c  -1-1 --> -2
c    ( b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧  b^{273, 1}_0 ∧ -p_273) -> ( b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0)
c  in CNF:
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨  b^{273, 2}_2
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨  b^{273, 2}_1
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨  p_273 ∨ -b^{273, 2}_0
c  in DIMACS:
-23135  23136 -23137  273  23138 0
-23135  23136 -23137  273  23139 0
-23135  23136 -23137  273 -23140 0

c  -2-1 --> break 
c    ( b^{273, 1}_2 ∧  b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧ -p_273) -> break
c  in CNF:
c    -b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨  b^{273, 1}_0 ∨  p_273 ∨ break
c  in DIMACS:
-23135 -23136  23137  273 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{273, 1}_2 ∧ -b^{273, 1}_1 ∧ -b^{273, 1}_0 ∧ true) 
c  in CNF:
c    -b^{273, 1}_2 ∨  b^{273, 1}_1 ∨  b^{273, 1}_0 ∨ false 
c  in DIMACS:
-23135  23136  23137  0

c  3 does not represent an automaton state.
c    -(-b^{273, 1}_2 ∧  b^{273, 1}_1 ∧  b^{273, 1}_0 ∧ true) 
c  in CNF:
c     b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ false 
c  in DIMACS:
 23135 -23136 -23137  0
c  -3 does not represent an automaton state.
c    -( b^{273, 1}_2 ∧  b^{273, 1}_1 ∧  b^{273, 1}_0 ∧ true) 
c  in CNF:
c    -b^{273, 1}_2 ∨ -b^{273, 1}_1 ∨ -b^{273, 1}_0 ∨ false 
c  in DIMACS:
-23135 -23136 -23137  0

c i = 2
c  -2+1 --> -1
c    ( b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧  p_546) -> ( b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0)
c  in CNF:
c    -b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨  b^{273, 3}_2
c    -b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_1
c    -b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨  b^{273, 3}_0
c  in DIMACS:
-23138 -23139  23140 -546  23141 0
-23138 -23139  23140 -546 -23142 0
-23138 -23139  23140 -546  23143 0

c  -1+1 --> 0
c    ( b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0 ∧  p_546) -> (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧ -b^{273, 3}_0)
c  in CNF:
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_2
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_1
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_0
c  in DIMACS:
-23138  23139 -23140 -546 -23141 0
-23138  23139 -23140 -546 -23142 0
-23138  23139 -23140 -546 -23143 0

c  0+1 --> 1
c    (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧  p_546) -> (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0)
c  in CNF:
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_2
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_1
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨  b^{273, 3}_0
c  in DIMACS:
 23138  23139  23140 -546 -23141 0
 23138  23139  23140 -546 -23142 0
 23138  23139  23140 -546  23143 0

c  1+1 --> 2
c    (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0 ∧  p_546) -> (-b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0)
c  in CNF:
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_2
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨  b^{273, 3}_1
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ -p_546 ∨ -b^{273, 3}_0
c  in DIMACS:
 23138  23139 -23140 -546 -23141 0
 23138  23139 -23140 -546  23142 0
 23138  23139 -23140 -546 -23143 0

c  2+1 --> break 
c    (-b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧  p_546) -> break
c  in CNF:
c     b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ -p_546 ∨ break
c  in DIMACS:
 23138 -23139  23140 -546 1162 0


c  2-1 --> 1
c    (-b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧ -p_546) -> (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0)
c  in CNF:
c     b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_2
c     b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_1
c     b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨  b^{273, 3}_0
c  in DIMACS:
 23138 -23139  23140  546 -23141 0
 23138 -23139  23140  546 -23142 0
 23138 -23139  23140  546  23143 0

c  1-1 --> 0
c    (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0 ∧ -p_546) -> (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧ -b^{273, 3}_0)
c  in CNF:
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_2
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_1
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_0
c  in DIMACS:
 23138  23139 -23140  546 -23141 0
 23138  23139 -23140  546 -23142 0
 23138  23139 -23140  546 -23143 0

c  0-1 --> -1
c    (-b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧ -p_546) -> ( b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0)
c  in CNF:
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨  b^{273, 3}_2
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_1
c     b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨  b^{273, 3}_0
c  in DIMACS:
 23138  23139  23140  546  23141 0
 23138  23139  23140  546 -23142 0
 23138  23139  23140  546  23143 0

c  -1-1 --> -2
c    ( b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧  b^{273, 2}_0 ∧ -p_546) -> ( b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0)
c  in CNF:
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨  b^{273, 3}_2
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨  b^{273, 3}_1
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨  p_546 ∨ -b^{273, 3}_0
c  in DIMACS:
-23138  23139 -23140  546  23141 0
-23138  23139 -23140  546  23142 0
-23138  23139 -23140  546 -23143 0

c  -2-1 --> break 
c    ( b^{273, 2}_2 ∧  b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧ -p_546) -> break
c  in CNF:
c    -b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨  b^{273, 2}_0 ∨  p_546 ∨ break
c  in DIMACS:
-23138 -23139  23140  546 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{273, 2}_2 ∧ -b^{273, 2}_1 ∧ -b^{273, 2}_0 ∧ true) 
c  in CNF:
c    -b^{273, 2}_2 ∨  b^{273, 2}_1 ∨  b^{273, 2}_0 ∨ false 
c  in DIMACS:
-23138  23139  23140  0

c  3 does not represent an automaton state.
c    -(-b^{273, 2}_2 ∧  b^{273, 2}_1 ∧  b^{273, 2}_0 ∧ true) 
c  in CNF:
c     b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ false 
c  in DIMACS:
 23138 -23139 -23140  0
c  -3 does not represent an automaton state.
c    -( b^{273, 2}_2 ∧  b^{273, 2}_1 ∧  b^{273, 2}_0 ∧ true) 
c  in CNF:
c    -b^{273, 2}_2 ∨ -b^{273, 2}_1 ∨ -b^{273, 2}_0 ∨ false 
c  in DIMACS:
-23138 -23139 -23140  0

c i = 3
c  -2+1 --> -1
c    ( b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧  p_819) -> ( b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0)
c  in CNF:
c    -b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨  b^{273, 4}_2
c    -b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_1
c    -b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨  b^{273, 4}_0
c  in DIMACS:
-23141 -23142  23143 -819  23144 0
-23141 -23142  23143 -819 -23145 0
-23141 -23142  23143 -819  23146 0

c  -1+1 --> 0
c    ( b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0 ∧  p_819) -> (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧ -b^{273, 4}_0)
c  in CNF:
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_2
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_1
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_0
c  in DIMACS:
-23141  23142 -23143 -819 -23144 0
-23141  23142 -23143 -819 -23145 0
-23141  23142 -23143 -819 -23146 0

c  0+1 --> 1
c    (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧  p_819) -> (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0)
c  in CNF:
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_2
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_1
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨  b^{273, 4}_0
c  in DIMACS:
 23141  23142  23143 -819 -23144 0
 23141  23142  23143 -819 -23145 0
 23141  23142  23143 -819  23146 0

c  1+1 --> 2
c    (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0 ∧  p_819) -> (-b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0)
c  in CNF:
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_2
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨  b^{273, 4}_1
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ -p_819 ∨ -b^{273, 4}_0
c  in DIMACS:
 23141  23142 -23143 -819 -23144 0
 23141  23142 -23143 -819  23145 0
 23141  23142 -23143 -819 -23146 0

c  2+1 --> break 
c    (-b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧  p_819) -> break
c  in CNF:
c     b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ -p_819 ∨ break
c  in DIMACS:
 23141 -23142  23143 -819 1162 0


c  2-1 --> 1
c    (-b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧ -p_819) -> (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0)
c  in CNF:
c     b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_2
c     b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_1
c     b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨  b^{273, 4}_0
c  in DIMACS:
 23141 -23142  23143  819 -23144 0
 23141 -23142  23143  819 -23145 0
 23141 -23142  23143  819  23146 0

c  1-1 --> 0
c    (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0 ∧ -p_819) -> (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧ -b^{273, 4}_0)
c  in CNF:
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_2
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_1
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_0
c  in DIMACS:
 23141  23142 -23143  819 -23144 0
 23141  23142 -23143  819 -23145 0
 23141  23142 -23143  819 -23146 0

c  0-1 --> -1
c    (-b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧ -p_819) -> ( b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0)
c  in CNF:
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨  b^{273, 4}_2
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_1
c     b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨  b^{273, 4}_0
c  in DIMACS:
 23141  23142  23143  819  23144 0
 23141  23142  23143  819 -23145 0
 23141  23142  23143  819  23146 0

c  -1-1 --> -2
c    ( b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧  b^{273, 3}_0 ∧ -p_819) -> ( b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0)
c  in CNF:
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨  b^{273, 4}_2
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨  b^{273, 4}_1
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨  p_819 ∨ -b^{273, 4}_0
c  in DIMACS:
-23141  23142 -23143  819  23144 0
-23141  23142 -23143  819  23145 0
-23141  23142 -23143  819 -23146 0

c  -2-1 --> break 
c    ( b^{273, 3}_2 ∧  b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧ -p_819) -> break
c  in CNF:
c    -b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨  b^{273, 3}_0 ∨  p_819 ∨ break
c  in DIMACS:
-23141 -23142  23143  819 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{273, 3}_2 ∧ -b^{273, 3}_1 ∧ -b^{273, 3}_0 ∧ true) 
c  in CNF:
c    -b^{273, 3}_2 ∨  b^{273, 3}_1 ∨  b^{273, 3}_0 ∨ false 
c  in DIMACS:
-23141  23142  23143  0

c  3 does not represent an automaton state.
c    -(-b^{273, 3}_2 ∧  b^{273, 3}_1 ∧  b^{273, 3}_0 ∧ true) 
c  in CNF:
c     b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ false 
c  in DIMACS:
 23141 -23142 -23143  0
c  -3 does not represent an automaton state.
c    -( b^{273, 3}_2 ∧  b^{273, 3}_1 ∧  b^{273, 3}_0 ∧ true) 
c  in CNF:
c    -b^{273, 3}_2 ∨ -b^{273, 3}_1 ∨ -b^{273, 3}_0 ∨ false 
c  in DIMACS:
-23141 -23142 -23143  0

c i = 4
c  -2+1 --> -1
c    ( b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧  p_1092) -> ( b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧  b^{273, 5}_0)
c  in CNF:
c    -b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨  b^{273, 5}_2
c    -b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_1
c    -b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨  b^{273, 5}_0
c  in DIMACS:
-23144 -23145  23146 -1092  23147 0
-23144 -23145  23146 -1092 -23148 0
-23144 -23145  23146 -1092  23149 0

c  -1+1 --> 0
c    ( b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0 ∧  p_1092) -> (-b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧ -b^{273, 5}_0)
c  in CNF:
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_2
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_1
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_0
c  in DIMACS:
-23144  23145 -23146 -1092 -23147 0
-23144  23145 -23146 -1092 -23148 0
-23144  23145 -23146 -1092 -23149 0

c  0+1 --> 1
c    (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧  p_1092) -> (-b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧  b^{273, 5}_0)
c  in CNF:
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_2
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_1
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨  b^{273, 5}_0
c  in DIMACS:
 23144  23145  23146 -1092 -23147 0
 23144  23145  23146 -1092 -23148 0
 23144  23145  23146 -1092  23149 0

c  1+1 --> 2
c    (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0 ∧  p_1092) -> (-b^{273, 5}_2 ∧  b^{273, 5}_1 ∧ -b^{273, 5}_0)
c  in CNF:
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_2
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨  b^{273, 5}_1
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ -p_1092 ∨ -b^{273, 5}_0
c  in DIMACS:
 23144  23145 -23146 -1092 -23147 0
 23144  23145 -23146 -1092  23148 0
 23144  23145 -23146 -1092 -23149 0

c  2+1 --> break 
c    (-b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 23144 -23145  23146 -1092 1162 0


c  2-1 --> 1
c    (-b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧ -p_1092) -> (-b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧  b^{273, 5}_0)
c  in CNF:
c     b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_2
c     b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_1
c     b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨  b^{273, 5}_0
c  in DIMACS:
 23144 -23145  23146  1092 -23147 0
 23144 -23145  23146  1092 -23148 0
 23144 -23145  23146  1092  23149 0

c  1-1 --> 0
c    (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0 ∧ -p_1092) -> (-b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧ -b^{273, 5}_0)
c  in CNF:
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_2
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_1
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_0
c  in DIMACS:
 23144  23145 -23146  1092 -23147 0
 23144  23145 -23146  1092 -23148 0
 23144  23145 -23146  1092 -23149 0

c  0-1 --> -1
c    (-b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧ -p_1092) -> ( b^{273, 5}_2 ∧ -b^{273, 5}_1 ∧  b^{273, 5}_0)
c  in CNF:
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨  b^{273, 5}_2
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_1
c     b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨  b^{273, 5}_0
c  in DIMACS:
 23144  23145  23146  1092  23147 0
 23144  23145  23146  1092 -23148 0
 23144  23145  23146  1092  23149 0

c  -1-1 --> -2
c    ( b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧  b^{273, 4}_0 ∧ -p_1092) -> ( b^{273, 5}_2 ∧  b^{273, 5}_1 ∧ -b^{273, 5}_0)
c  in CNF:
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨  b^{273, 5}_2
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨  b^{273, 5}_1
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨  p_1092 ∨ -b^{273, 5}_0
c  in DIMACS:
-23144  23145 -23146  1092  23147 0
-23144  23145 -23146  1092  23148 0
-23144  23145 -23146  1092 -23149 0

c  -2-1 --> break 
c    ( b^{273, 4}_2 ∧  b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨  b^{273, 4}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-23144 -23145  23146  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{273, 4}_2 ∧ -b^{273, 4}_1 ∧ -b^{273, 4}_0 ∧ true) 
c  in CNF:
c    -b^{273, 4}_2 ∨  b^{273, 4}_1 ∨  b^{273, 4}_0 ∨ false 
c  in DIMACS:
-23144  23145  23146  0

c  3 does not represent an automaton state.
c    -(-b^{273, 4}_2 ∧  b^{273, 4}_1 ∧  b^{273, 4}_0 ∧ true) 
c  in CNF:
c     b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ false 
c  in DIMACS:
 23144 -23145 -23146  0
c  -3 does not represent an automaton state.
c    -( b^{273, 4}_2 ∧  b^{273, 4}_1 ∧  b^{273, 4}_0 ∧ true) 
c  in CNF:
c    -b^{273, 4}_2 ∨ -b^{273, 4}_1 ∨ -b^{273, 4}_0 ∨ false 
c  in DIMACS:
-23144 -23145 -23146  0

c INIT for k = 274
c    -b^{274, 1}_2
c    -b^{274, 1}_1
c    -b^{274, 1}_0
c  in DIMACS:
-23150 0
-23151 0
-23152 0

c Transitions for k = 274
c i = 1
c  -2+1 --> -1
c    ( b^{274, 1}_2 ∧  b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧  p_274) -> ( b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0)
c  in CNF:
c    -b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨  b^{274, 2}_2
c    -b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_1
c    -b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨  b^{274, 2}_0
c  in DIMACS:
-23150 -23151  23152 -274  23153 0
-23150 -23151  23152 -274 -23154 0
-23150 -23151  23152 -274  23155 0

c  -1+1 --> 0
c    ( b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧  b^{274, 1}_0 ∧  p_274) -> (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧ -b^{274, 2}_0)
c  in CNF:
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_2
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_1
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_0
c  in DIMACS:
-23150  23151 -23152 -274 -23153 0
-23150  23151 -23152 -274 -23154 0
-23150  23151 -23152 -274 -23155 0

c  0+1 --> 1
c    (-b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧  p_274) -> (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0)
c  in CNF:
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_2
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_1
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨  b^{274, 2}_0
c  in DIMACS:
 23150  23151  23152 -274 -23153 0
 23150  23151  23152 -274 -23154 0
 23150  23151  23152 -274  23155 0

c  1+1 --> 2
c    (-b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧  b^{274, 1}_0 ∧  p_274) -> (-b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0)
c  in CNF:
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_2
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨  b^{274, 2}_1
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ -p_274 ∨ -b^{274, 2}_0
c  in DIMACS:
 23150  23151 -23152 -274 -23153 0
 23150  23151 -23152 -274  23154 0
 23150  23151 -23152 -274 -23155 0

c  2+1 --> break 
c    (-b^{274, 1}_2 ∧  b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧  p_274) -> break
c  in CNF:
c     b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ -p_274 ∨ break
c  in DIMACS:
 23150 -23151  23152 -274 1162 0


c  2-1 --> 1
c    (-b^{274, 1}_2 ∧  b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧ -p_274) -> (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0)
c  in CNF:
c     b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_2
c     b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_1
c     b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨  b^{274, 2}_0
c  in DIMACS:
 23150 -23151  23152  274 -23153 0
 23150 -23151  23152  274 -23154 0
 23150 -23151  23152  274  23155 0

c  1-1 --> 0
c    (-b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧  b^{274, 1}_0 ∧ -p_274) -> (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧ -b^{274, 2}_0)
c  in CNF:
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_2
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_1
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_0
c  in DIMACS:
 23150  23151 -23152  274 -23153 0
 23150  23151 -23152  274 -23154 0
 23150  23151 -23152  274 -23155 0

c  0-1 --> -1
c    (-b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧ -p_274) -> ( b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0)
c  in CNF:
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨  b^{274, 2}_2
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_1
c     b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨  b^{274, 2}_0
c  in DIMACS:
 23150  23151  23152  274  23153 0
 23150  23151  23152  274 -23154 0
 23150  23151  23152  274  23155 0

c  -1-1 --> -2
c    ( b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧  b^{274, 1}_0 ∧ -p_274) -> ( b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0)
c  in CNF:
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨  b^{274, 2}_2
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨  b^{274, 2}_1
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨  p_274 ∨ -b^{274, 2}_0
c  in DIMACS:
-23150  23151 -23152  274  23153 0
-23150  23151 -23152  274  23154 0
-23150  23151 -23152  274 -23155 0

c  -2-1 --> break 
c    ( b^{274, 1}_2 ∧  b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧ -p_274) -> break
c  in CNF:
c    -b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨  b^{274, 1}_0 ∨  p_274 ∨ break
c  in DIMACS:
-23150 -23151  23152  274 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{274, 1}_2 ∧ -b^{274, 1}_1 ∧ -b^{274, 1}_0 ∧ true) 
c  in CNF:
c    -b^{274, 1}_2 ∨  b^{274, 1}_1 ∨  b^{274, 1}_0 ∨ false 
c  in DIMACS:
-23150  23151  23152  0

c  3 does not represent an automaton state.
c    -(-b^{274, 1}_2 ∧  b^{274, 1}_1 ∧  b^{274, 1}_0 ∧ true) 
c  in CNF:
c     b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ false 
c  in DIMACS:
 23150 -23151 -23152  0
c  -3 does not represent an automaton state.
c    -( b^{274, 1}_2 ∧  b^{274, 1}_1 ∧  b^{274, 1}_0 ∧ true) 
c  in CNF:
c    -b^{274, 1}_2 ∨ -b^{274, 1}_1 ∨ -b^{274, 1}_0 ∨ false 
c  in DIMACS:
-23150 -23151 -23152  0

c i = 2
c  -2+1 --> -1
c    ( b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧  p_548) -> ( b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0)
c  in CNF:
c    -b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨  b^{274, 3}_2
c    -b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_1
c    -b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨  b^{274, 3}_0
c  in DIMACS:
-23153 -23154  23155 -548  23156 0
-23153 -23154  23155 -548 -23157 0
-23153 -23154  23155 -548  23158 0

c  -1+1 --> 0
c    ( b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0 ∧  p_548) -> (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧ -b^{274, 3}_0)
c  in CNF:
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_2
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_1
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_0
c  in DIMACS:
-23153  23154 -23155 -548 -23156 0
-23153  23154 -23155 -548 -23157 0
-23153  23154 -23155 -548 -23158 0

c  0+1 --> 1
c    (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧  p_548) -> (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0)
c  in CNF:
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_2
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_1
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨  b^{274, 3}_0
c  in DIMACS:
 23153  23154  23155 -548 -23156 0
 23153  23154  23155 -548 -23157 0
 23153  23154  23155 -548  23158 0

c  1+1 --> 2
c    (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0 ∧  p_548) -> (-b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0)
c  in CNF:
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_2
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨  b^{274, 3}_1
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ -p_548 ∨ -b^{274, 3}_0
c  in DIMACS:
 23153  23154 -23155 -548 -23156 0
 23153  23154 -23155 -548  23157 0
 23153  23154 -23155 -548 -23158 0

c  2+1 --> break 
c    (-b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧  p_548) -> break
c  in CNF:
c     b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ -p_548 ∨ break
c  in DIMACS:
 23153 -23154  23155 -548 1162 0


c  2-1 --> 1
c    (-b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧ -p_548) -> (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0)
c  in CNF:
c     b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_2
c     b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_1
c     b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨  b^{274, 3}_0
c  in DIMACS:
 23153 -23154  23155  548 -23156 0
 23153 -23154  23155  548 -23157 0
 23153 -23154  23155  548  23158 0

c  1-1 --> 0
c    (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0 ∧ -p_548) -> (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧ -b^{274, 3}_0)
c  in CNF:
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_2
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_1
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_0
c  in DIMACS:
 23153  23154 -23155  548 -23156 0
 23153  23154 -23155  548 -23157 0
 23153  23154 -23155  548 -23158 0

c  0-1 --> -1
c    (-b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧ -p_548) -> ( b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0)
c  in CNF:
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨  b^{274, 3}_2
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_1
c     b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨  b^{274, 3}_0
c  in DIMACS:
 23153  23154  23155  548  23156 0
 23153  23154  23155  548 -23157 0
 23153  23154  23155  548  23158 0

c  -1-1 --> -2
c    ( b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧  b^{274, 2}_0 ∧ -p_548) -> ( b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0)
c  in CNF:
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨  b^{274, 3}_2
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨  b^{274, 3}_1
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨  p_548 ∨ -b^{274, 3}_0
c  in DIMACS:
-23153  23154 -23155  548  23156 0
-23153  23154 -23155  548  23157 0
-23153  23154 -23155  548 -23158 0

c  -2-1 --> break 
c    ( b^{274, 2}_2 ∧  b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧ -p_548) -> break
c  in CNF:
c    -b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨  b^{274, 2}_0 ∨  p_548 ∨ break
c  in DIMACS:
-23153 -23154  23155  548 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{274, 2}_2 ∧ -b^{274, 2}_1 ∧ -b^{274, 2}_0 ∧ true) 
c  in CNF:
c    -b^{274, 2}_2 ∨  b^{274, 2}_1 ∨  b^{274, 2}_0 ∨ false 
c  in DIMACS:
-23153  23154  23155  0

c  3 does not represent an automaton state.
c    -(-b^{274, 2}_2 ∧  b^{274, 2}_1 ∧  b^{274, 2}_0 ∧ true) 
c  in CNF:
c     b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ false 
c  in DIMACS:
 23153 -23154 -23155  0
c  -3 does not represent an automaton state.
c    -( b^{274, 2}_2 ∧  b^{274, 2}_1 ∧  b^{274, 2}_0 ∧ true) 
c  in CNF:
c    -b^{274, 2}_2 ∨ -b^{274, 2}_1 ∨ -b^{274, 2}_0 ∨ false 
c  in DIMACS:
-23153 -23154 -23155  0

c i = 3
c  -2+1 --> -1
c    ( b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧  p_822) -> ( b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0)
c  in CNF:
c    -b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨  b^{274, 4}_2
c    -b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_1
c    -b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨  b^{274, 4}_0
c  in DIMACS:
-23156 -23157  23158 -822  23159 0
-23156 -23157  23158 -822 -23160 0
-23156 -23157  23158 -822  23161 0

c  -1+1 --> 0
c    ( b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0 ∧  p_822) -> (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧ -b^{274, 4}_0)
c  in CNF:
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_2
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_1
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_0
c  in DIMACS:
-23156  23157 -23158 -822 -23159 0
-23156  23157 -23158 -822 -23160 0
-23156  23157 -23158 -822 -23161 0

c  0+1 --> 1
c    (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧  p_822) -> (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0)
c  in CNF:
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_2
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_1
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨  b^{274, 4}_0
c  in DIMACS:
 23156  23157  23158 -822 -23159 0
 23156  23157  23158 -822 -23160 0
 23156  23157  23158 -822  23161 0

c  1+1 --> 2
c    (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0 ∧  p_822) -> (-b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0)
c  in CNF:
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_2
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨  b^{274, 4}_1
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ -p_822 ∨ -b^{274, 4}_0
c  in DIMACS:
 23156  23157 -23158 -822 -23159 0
 23156  23157 -23158 -822  23160 0
 23156  23157 -23158 -822 -23161 0

c  2+1 --> break 
c    (-b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧  p_822) -> break
c  in CNF:
c     b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ -p_822 ∨ break
c  in DIMACS:
 23156 -23157  23158 -822 1162 0


c  2-1 --> 1
c    (-b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧ -p_822) -> (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0)
c  in CNF:
c     b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_2
c     b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_1
c     b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨  b^{274, 4}_0
c  in DIMACS:
 23156 -23157  23158  822 -23159 0
 23156 -23157  23158  822 -23160 0
 23156 -23157  23158  822  23161 0

c  1-1 --> 0
c    (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0 ∧ -p_822) -> (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧ -b^{274, 4}_0)
c  in CNF:
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_2
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_1
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_0
c  in DIMACS:
 23156  23157 -23158  822 -23159 0
 23156  23157 -23158  822 -23160 0
 23156  23157 -23158  822 -23161 0

c  0-1 --> -1
c    (-b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧ -p_822) -> ( b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0)
c  in CNF:
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨  b^{274, 4}_2
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_1
c     b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨  b^{274, 4}_0
c  in DIMACS:
 23156  23157  23158  822  23159 0
 23156  23157  23158  822 -23160 0
 23156  23157  23158  822  23161 0

c  -1-1 --> -2
c    ( b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧  b^{274, 3}_0 ∧ -p_822) -> ( b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0)
c  in CNF:
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨  b^{274, 4}_2
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨  b^{274, 4}_1
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨  p_822 ∨ -b^{274, 4}_0
c  in DIMACS:
-23156  23157 -23158  822  23159 0
-23156  23157 -23158  822  23160 0
-23156  23157 -23158  822 -23161 0

c  -2-1 --> break 
c    ( b^{274, 3}_2 ∧  b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧ -p_822) -> break
c  in CNF:
c    -b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨  b^{274, 3}_0 ∨  p_822 ∨ break
c  in DIMACS:
-23156 -23157  23158  822 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{274, 3}_2 ∧ -b^{274, 3}_1 ∧ -b^{274, 3}_0 ∧ true) 
c  in CNF:
c    -b^{274, 3}_2 ∨  b^{274, 3}_1 ∨  b^{274, 3}_0 ∨ false 
c  in DIMACS:
-23156  23157  23158  0

c  3 does not represent an automaton state.
c    -(-b^{274, 3}_2 ∧  b^{274, 3}_1 ∧  b^{274, 3}_0 ∧ true) 
c  in CNF:
c     b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ false 
c  in DIMACS:
 23156 -23157 -23158  0
c  -3 does not represent an automaton state.
c    -( b^{274, 3}_2 ∧  b^{274, 3}_1 ∧  b^{274, 3}_0 ∧ true) 
c  in CNF:
c    -b^{274, 3}_2 ∨ -b^{274, 3}_1 ∨ -b^{274, 3}_0 ∨ false 
c  in DIMACS:
-23156 -23157 -23158  0

c i = 4
c  -2+1 --> -1
c    ( b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧  p_1096) -> ( b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧  b^{274, 5}_0)
c  in CNF:
c    -b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨  b^{274, 5}_2
c    -b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_1
c    -b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨  b^{274, 5}_0
c  in DIMACS:
-23159 -23160  23161 -1096  23162 0
-23159 -23160  23161 -1096 -23163 0
-23159 -23160  23161 -1096  23164 0

c  -1+1 --> 0
c    ( b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0 ∧  p_1096) -> (-b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧ -b^{274, 5}_0)
c  in CNF:
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_2
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_1
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_0
c  in DIMACS:
-23159  23160 -23161 -1096 -23162 0
-23159  23160 -23161 -1096 -23163 0
-23159  23160 -23161 -1096 -23164 0

c  0+1 --> 1
c    (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧  p_1096) -> (-b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧  b^{274, 5}_0)
c  in CNF:
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_2
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_1
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨  b^{274, 5}_0
c  in DIMACS:
 23159  23160  23161 -1096 -23162 0
 23159  23160  23161 -1096 -23163 0
 23159  23160  23161 -1096  23164 0

c  1+1 --> 2
c    (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0 ∧  p_1096) -> (-b^{274, 5}_2 ∧  b^{274, 5}_1 ∧ -b^{274, 5}_0)
c  in CNF:
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_2
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨  b^{274, 5}_1
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ -p_1096 ∨ -b^{274, 5}_0
c  in DIMACS:
 23159  23160 -23161 -1096 -23162 0
 23159  23160 -23161 -1096  23163 0
 23159  23160 -23161 -1096 -23164 0

c  2+1 --> break 
c    (-b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧  p_1096) -> break
c  in CNF:
c     b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ -p_1096 ∨ break
c  in DIMACS:
 23159 -23160  23161 -1096 1162 0


c  2-1 --> 1
c    (-b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧ -p_1096) -> (-b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧  b^{274, 5}_0)
c  in CNF:
c     b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_2
c     b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_1
c     b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨  b^{274, 5}_0
c  in DIMACS:
 23159 -23160  23161  1096 -23162 0
 23159 -23160  23161  1096 -23163 0
 23159 -23160  23161  1096  23164 0

c  1-1 --> 0
c    (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0 ∧ -p_1096) -> (-b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧ -b^{274, 5}_0)
c  in CNF:
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_2
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_1
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_0
c  in DIMACS:
 23159  23160 -23161  1096 -23162 0
 23159  23160 -23161  1096 -23163 0
 23159  23160 -23161  1096 -23164 0

c  0-1 --> -1
c    (-b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧ -p_1096) -> ( b^{274, 5}_2 ∧ -b^{274, 5}_1 ∧  b^{274, 5}_0)
c  in CNF:
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨  b^{274, 5}_2
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_1
c     b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨  b^{274, 5}_0
c  in DIMACS:
 23159  23160  23161  1096  23162 0
 23159  23160  23161  1096 -23163 0
 23159  23160  23161  1096  23164 0

c  -1-1 --> -2
c    ( b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧  b^{274, 4}_0 ∧ -p_1096) -> ( b^{274, 5}_2 ∧  b^{274, 5}_1 ∧ -b^{274, 5}_0)
c  in CNF:
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨  b^{274, 5}_2
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨  b^{274, 5}_1
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨  p_1096 ∨ -b^{274, 5}_0
c  in DIMACS:
-23159  23160 -23161  1096  23162 0
-23159  23160 -23161  1096  23163 0
-23159  23160 -23161  1096 -23164 0

c  -2-1 --> break 
c    ( b^{274, 4}_2 ∧  b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧ -p_1096) -> break
c  in CNF:
c    -b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨  b^{274, 4}_0 ∨  p_1096 ∨ break
c  in DIMACS:
-23159 -23160  23161  1096 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{274, 4}_2 ∧ -b^{274, 4}_1 ∧ -b^{274, 4}_0 ∧ true) 
c  in CNF:
c    -b^{274, 4}_2 ∨  b^{274, 4}_1 ∨  b^{274, 4}_0 ∨ false 
c  in DIMACS:
-23159  23160  23161  0

c  3 does not represent an automaton state.
c    -(-b^{274, 4}_2 ∧  b^{274, 4}_1 ∧  b^{274, 4}_0 ∧ true) 
c  in CNF:
c     b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ false 
c  in DIMACS:
 23159 -23160 -23161  0
c  -3 does not represent an automaton state.
c    -( b^{274, 4}_2 ∧  b^{274, 4}_1 ∧  b^{274, 4}_0 ∧ true) 
c  in CNF:
c    -b^{274, 4}_2 ∨ -b^{274, 4}_1 ∨ -b^{274, 4}_0 ∨ false 
c  in DIMACS:
-23159 -23160 -23161  0

c INIT for k = 275
c    -b^{275, 1}_2
c    -b^{275, 1}_1
c    -b^{275, 1}_0
c  in DIMACS:
-23165 0
-23166 0
-23167 0

c Transitions for k = 275
c i = 1
c  -2+1 --> -1
c    ( b^{275, 1}_2 ∧  b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧  p_275) -> ( b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0)
c  in CNF:
c    -b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨  b^{275, 2}_2
c    -b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_1
c    -b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨  b^{275, 2}_0
c  in DIMACS:
-23165 -23166  23167 -275  23168 0
-23165 -23166  23167 -275 -23169 0
-23165 -23166  23167 -275  23170 0

c  -1+1 --> 0
c    ( b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧  b^{275, 1}_0 ∧  p_275) -> (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧ -b^{275, 2}_0)
c  in CNF:
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_2
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_1
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_0
c  in DIMACS:
-23165  23166 -23167 -275 -23168 0
-23165  23166 -23167 -275 -23169 0
-23165  23166 -23167 -275 -23170 0

c  0+1 --> 1
c    (-b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧  p_275) -> (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0)
c  in CNF:
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_2
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_1
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨  b^{275, 2}_0
c  in DIMACS:
 23165  23166  23167 -275 -23168 0
 23165  23166  23167 -275 -23169 0
 23165  23166  23167 -275  23170 0

c  1+1 --> 2
c    (-b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧  b^{275, 1}_0 ∧  p_275) -> (-b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0)
c  in CNF:
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_2
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨  b^{275, 2}_1
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ -p_275 ∨ -b^{275, 2}_0
c  in DIMACS:
 23165  23166 -23167 -275 -23168 0
 23165  23166 -23167 -275  23169 0
 23165  23166 -23167 -275 -23170 0

c  2+1 --> break 
c    (-b^{275, 1}_2 ∧  b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧  p_275) -> break
c  in CNF:
c     b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ -p_275 ∨ break
c  in DIMACS:
 23165 -23166  23167 -275 1162 0


c  2-1 --> 1
c    (-b^{275, 1}_2 ∧  b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧ -p_275) -> (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0)
c  in CNF:
c     b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_2
c     b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_1
c     b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨  b^{275, 2}_0
c  in DIMACS:
 23165 -23166  23167  275 -23168 0
 23165 -23166  23167  275 -23169 0
 23165 -23166  23167  275  23170 0

c  1-1 --> 0
c    (-b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧  b^{275, 1}_0 ∧ -p_275) -> (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧ -b^{275, 2}_0)
c  in CNF:
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_2
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_1
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_0
c  in DIMACS:
 23165  23166 -23167  275 -23168 0
 23165  23166 -23167  275 -23169 0
 23165  23166 -23167  275 -23170 0

c  0-1 --> -1
c    (-b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧ -p_275) -> ( b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0)
c  in CNF:
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨  b^{275, 2}_2
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_1
c     b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨  b^{275, 2}_0
c  in DIMACS:
 23165  23166  23167  275  23168 0
 23165  23166  23167  275 -23169 0
 23165  23166  23167  275  23170 0

c  -1-1 --> -2
c    ( b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧  b^{275, 1}_0 ∧ -p_275) -> ( b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0)
c  in CNF:
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨  b^{275, 2}_2
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨  b^{275, 2}_1
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨  p_275 ∨ -b^{275, 2}_0
c  in DIMACS:
-23165  23166 -23167  275  23168 0
-23165  23166 -23167  275  23169 0
-23165  23166 -23167  275 -23170 0

c  -2-1 --> break 
c    ( b^{275, 1}_2 ∧  b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧ -p_275) -> break
c  in CNF:
c    -b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨  b^{275, 1}_0 ∨  p_275 ∨ break
c  in DIMACS:
-23165 -23166  23167  275 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{275, 1}_2 ∧ -b^{275, 1}_1 ∧ -b^{275, 1}_0 ∧ true) 
c  in CNF:
c    -b^{275, 1}_2 ∨  b^{275, 1}_1 ∨  b^{275, 1}_0 ∨ false 
c  in DIMACS:
-23165  23166  23167  0

c  3 does not represent an automaton state.
c    -(-b^{275, 1}_2 ∧  b^{275, 1}_1 ∧  b^{275, 1}_0 ∧ true) 
c  in CNF:
c     b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ false 
c  in DIMACS:
 23165 -23166 -23167  0
c  -3 does not represent an automaton state.
c    -( b^{275, 1}_2 ∧  b^{275, 1}_1 ∧  b^{275, 1}_0 ∧ true) 
c  in CNF:
c    -b^{275, 1}_2 ∨ -b^{275, 1}_1 ∨ -b^{275, 1}_0 ∨ false 
c  in DIMACS:
-23165 -23166 -23167  0

c i = 2
c  -2+1 --> -1
c    ( b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧  p_550) -> ( b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0)
c  in CNF:
c    -b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨  b^{275, 3}_2
c    -b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_1
c    -b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨  b^{275, 3}_0
c  in DIMACS:
-23168 -23169  23170 -550  23171 0
-23168 -23169  23170 -550 -23172 0
-23168 -23169  23170 -550  23173 0

c  -1+1 --> 0
c    ( b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0 ∧  p_550) -> (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧ -b^{275, 3}_0)
c  in CNF:
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_2
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_1
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_0
c  in DIMACS:
-23168  23169 -23170 -550 -23171 0
-23168  23169 -23170 -550 -23172 0
-23168  23169 -23170 -550 -23173 0

c  0+1 --> 1
c    (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧  p_550) -> (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0)
c  in CNF:
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_2
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_1
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨  b^{275, 3}_0
c  in DIMACS:
 23168  23169  23170 -550 -23171 0
 23168  23169  23170 -550 -23172 0
 23168  23169  23170 -550  23173 0

c  1+1 --> 2
c    (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0 ∧  p_550) -> (-b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0)
c  in CNF:
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_2
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨  b^{275, 3}_1
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ -p_550 ∨ -b^{275, 3}_0
c  in DIMACS:
 23168  23169 -23170 -550 -23171 0
 23168  23169 -23170 -550  23172 0
 23168  23169 -23170 -550 -23173 0

c  2+1 --> break 
c    (-b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧  p_550) -> break
c  in CNF:
c     b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ -p_550 ∨ break
c  in DIMACS:
 23168 -23169  23170 -550 1162 0


c  2-1 --> 1
c    (-b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧ -p_550) -> (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0)
c  in CNF:
c     b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_2
c     b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_1
c     b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨  b^{275, 3}_0
c  in DIMACS:
 23168 -23169  23170  550 -23171 0
 23168 -23169  23170  550 -23172 0
 23168 -23169  23170  550  23173 0

c  1-1 --> 0
c    (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0 ∧ -p_550) -> (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧ -b^{275, 3}_0)
c  in CNF:
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_2
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_1
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_0
c  in DIMACS:
 23168  23169 -23170  550 -23171 0
 23168  23169 -23170  550 -23172 0
 23168  23169 -23170  550 -23173 0

c  0-1 --> -1
c    (-b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧ -p_550) -> ( b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0)
c  in CNF:
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨  b^{275, 3}_2
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_1
c     b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨  b^{275, 3}_0
c  in DIMACS:
 23168  23169  23170  550  23171 0
 23168  23169  23170  550 -23172 0
 23168  23169  23170  550  23173 0

c  -1-1 --> -2
c    ( b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧  b^{275, 2}_0 ∧ -p_550) -> ( b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0)
c  in CNF:
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨  b^{275, 3}_2
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨  b^{275, 3}_1
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨  p_550 ∨ -b^{275, 3}_0
c  in DIMACS:
-23168  23169 -23170  550  23171 0
-23168  23169 -23170  550  23172 0
-23168  23169 -23170  550 -23173 0

c  -2-1 --> break 
c    ( b^{275, 2}_2 ∧  b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧ -p_550) -> break
c  in CNF:
c    -b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨  b^{275, 2}_0 ∨  p_550 ∨ break
c  in DIMACS:
-23168 -23169  23170  550 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{275, 2}_2 ∧ -b^{275, 2}_1 ∧ -b^{275, 2}_0 ∧ true) 
c  in CNF:
c    -b^{275, 2}_2 ∨  b^{275, 2}_1 ∨  b^{275, 2}_0 ∨ false 
c  in DIMACS:
-23168  23169  23170  0

c  3 does not represent an automaton state.
c    -(-b^{275, 2}_2 ∧  b^{275, 2}_1 ∧  b^{275, 2}_0 ∧ true) 
c  in CNF:
c     b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ false 
c  in DIMACS:
 23168 -23169 -23170  0
c  -3 does not represent an automaton state.
c    -( b^{275, 2}_2 ∧  b^{275, 2}_1 ∧  b^{275, 2}_0 ∧ true) 
c  in CNF:
c    -b^{275, 2}_2 ∨ -b^{275, 2}_1 ∨ -b^{275, 2}_0 ∨ false 
c  in DIMACS:
-23168 -23169 -23170  0

c i = 3
c  -2+1 --> -1
c    ( b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧  p_825) -> ( b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0)
c  in CNF:
c    -b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨  b^{275, 4}_2
c    -b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_1
c    -b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨  b^{275, 4}_0
c  in DIMACS:
-23171 -23172  23173 -825  23174 0
-23171 -23172  23173 -825 -23175 0
-23171 -23172  23173 -825  23176 0

c  -1+1 --> 0
c    ( b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0 ∧  p_825) -> (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧ -b^{275, 4}_0)
c  in CNF:
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_2
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_1
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_0
c  in DIMACS:
-23171  23172 -23173 -825 -23174 0
-23171  23172 -23173 -825 -23175 0
-23171  23172 -23173 -825 -23176 0

c  0+1 --> 1
c    (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧  p_825) -> (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0)
c  in CNF:
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_2
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_1
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨  b^{275, 4}_0
c  in DIMACS:
 23171  23172  23173 -825 -23174 0
 23171  23172  23173 -825 -23175 0
 23171  23172  23173 -825  23176 0

c  1+1 --> 2
c    (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0 ∧  p_825) -> (-b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0)
c  in CNF:
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_2
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨  b^{275, 4}_1
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ -p_825 ∨ -b^{275, 4}_0
c  in DIMACS:
 23171  23172 -23173 -825 -23174 0
 23171  23172 -23173 -825  23175 0
 23171  23172 -23173 -825 -23176 0

c  2+1 --> break 
c    (-b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧  p_825) -> break
c  in CNF:
c     b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ -p_825 ∨ break
c  in DIMACS:
 23171 -23172  23173 -825 1162 0


c  2-1 --> 1
c    (-b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧ -p_825) -> (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0)
c  in CNF:
c     b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_2
c     b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_1
c     b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨  b^{275, 4}_0
c  in DIMACS:
 23171 -23172  23173  825 -23174 0
 23171 -23172  23173  825 -23175 0
 23171 -23172  23173  825  23176 0

c  1-1 --> 0
c    (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0 ∧ -p_825) -> (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧ -b^{275, 4}_0)
c  in CNF:
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_2
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_1
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_0
c  in DIMACS:
 23171  23172 -23173  825 -23174 0
 23171  23172 -23173  825 -23175 0
 23171  23172 -23173  825 -23176 0

c  0-1 --> -1
c    (-b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧ -p_825) -> ( b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0)
c  in CNF:
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨  b^{275, 4}_2
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_1
c     b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨  b^{275, 4}_0
c  in DIMACS:
 23171  23172  23173  825  23174 0
 23171  23172  23173  825 -23175 0
 23171  23172  23173  825  23176 0

c  -1-1 --> -2
c    ( b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧  b^{275, 3}_0 ∧ -p_825) -> ( b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0)
c  in CNF:
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨  b^{275, 4}_2
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨  b^{275, 4}_1
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨  p_825 ∨ -b^{275, 4}_0
c  in DIMACS:
-23171  23172 -23173  825  23174 0
-23171  23172 -23173  825  23175 0
-23171  23172 -23173  825 -23176 0

c  -2-1 --> break 
c    ( b^{275, 3}_2 ∧  b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧ -p_825) -> break
c  in CNF:
c    -b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨  b^{275, 3}_0 ∨  p_825 ∨ break
c  in DIMACS:
-23171 -23172  23173  825 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{275, 3}_2 ∧ -b^{275, 3}_1 ∧ -b^{275, 3}_0 ∧ true) 
c  in CNF:
c    -b^{275, 3}_2 ∨  b^{275, 3}_1 ∨  b^{275, 3}_0 ∨ false 
c  in DIMACS:
-23171  23172  23173  0

c  3 does not represent an automaton state.
c    -(-b^{275, 3}_2 ∧  b^{275, 3}_1 ∧  b^{275, 3}_0 ∧ true) 
c  in CNF:
c     b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ false 
c  in DIMACS:
 23171 -23172 -23173  0
c  -3 does not represent an automaton state.
c    -( b^{275, 3}_2 ∧  b^{275, 3}_1 ∧  b^{275, 3}_0 ∧ true) 
c  in CNF:
c    -b^{275, 3}_2 ∨ -b^{275, 3}_1 ∨ -b^{275, 3}_0 ∨ false 
c  in DIMACS:
-23171 -23172 -23173  0

c i = 4
c  -2+1 --> -1
c    ( b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧  p_1100) -> ( b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧  b^{275, 5}_0)
c  in CNF:
c    -b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨  b^{275, 5}_2
c    -b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_1
c    -b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨  b^{275, 5}_0
c  in DIMACS:
-23174 -23175  23176 -1100  23177 0
-23174 -23175  23176 -1100 -23178 0
-23174 -23175  23176 -1100  23179 0

c  -1+1 --> 0
c    ( b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0 ∧  p_1100) -> (-b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧ -b^{275, 5}_0)
c  in CNF:
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_2
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_1
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_0
c  in DIMACS:
-23174  23175 -23176 -1100 -23177 0
-23174  23175 -23176 -1100 -23178 0
-23174  23175 -23176 -1100 -23179 0

c  0+1 --> 1
c    (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧  p_1100) -> (-b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧  b^{275, 5}_0)
c  in CNF:
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_2
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_1
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨  b^{275, 5}_0
c  in DIMACS:
 23174  23175  23176 -1100 -23177 0
 23174  23175  23176 -1100 -23178 0
 23174  23175  23176 -1100  23179 0

c  1+1 --> 2
c    (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0 ∧  p_1100) -> (-b^{275, 5}_2 ∧  b^{275, 5}_1 ∧ -b^{275, 5}_0)
c  in CNF:
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_2
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨  b^{275, 5}_1
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ -p_1100 ∨ -b^{275, 5}_0
c  in DIMACS:
 23174  23175 -23176 -1100 -23177 0
 23174  23175 -23176 -1100  23178 0
 23174  23175 -23176 -1100 -23179 0

c  2+1 --> break 
c    (-b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧  p_1100) -> break
c  in CNF:
c     b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ -p_1100 ∨ break
c  in DIMACS:
 23174 -23175  23176 -1100 1162 0


c  2-1 --> 1
c    (-b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧ -p_1100) -> (-b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧  b^{275, 5}_0)
c  in CNF:
c     b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_2
c     b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_1
c     b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨  b^{275, 5}_0
c  in DIMACS:
 23174 -23175  23176  1100 -23177 0
 23174 -23175  23176  1100 -23178 0
 23174 -23175  23176  1100  23179 0

c  1-1 --> 0
c    (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0 ∧ -p_1100) -> (-b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧ -b^{275, 5}_0)
c  in CNF:
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_2
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_1
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_0
c  in DIMACS:
 23174  23175 -23176  1100 -23177 0
 23174  23175 -23176  1100 -23178 0
 23174  23175 -23176  1100 -23179 0

c  0-1 --> -1
c    (-b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧ -p_1100) -> ( b^{275, 5}_2 ∧ -b^{275, 5}_1 ∧  b^{275, 5}_0)
c  in CNF:
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨  b^{275, 5}_2
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_1
c     b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨  b^{275, 5}_0
c  in DIMACS:
 23174  23175  23176  1100  23177 0
 23174  23175  23176  1100 -23178 0
 23174  23175  23176  1100  23179 0

c  -1-1 --> -2
c    ( b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧  b^{275, 4}_0 ∧ -p_1100) -> ( b^{275, 5}_2 ∧  b^{275, 5}_1 ∧ -b^{275, 5}_0)
c  in CNF:
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨  b^{275, 5}_2
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨  b^{275, 5}_1
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨  p_1100 ∨ -b^{275, 5}_0
c  in DIMACS:
-23174  23175 -23176  1100  23177 0
-23174  23175 -23176  1100  23178 0
-23174  23175 -23176  1100 -23179 0

c  -2-1 --> break 
c    ( b^{275, 4}_2 ∧  b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧ -p_1100) -> break
c  in CNF:
c    -b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨  b^{275, 4}_0 ∨  p_1100 ∨ break
c  in DIMACS:
-23174 -23175  23176  1100 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{275, 4}_2 ∧ -b^{275, 4}_1 ∧ -b^{275, 4}_0 ∧ true) 
c  in CNF:
c    -b^{275, 4}_2 ∨  b^{275, 4}_1 ∨  b^{275, 4}_0 ∨ false 
c  in DIMACS:
-23174  23175  23176  0

c  3 does not represent an automaton state.
c    -(-b^{275, 4}_2 ∧  b^{275, 4}_1 ∧  b^{275, 4}_0 ∧ true) 
c  in CNF:
c     b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ false 
c  in DIMACS:
 23174 -23175 -23176  0
c  -3 does not represent an automaton state.
c    -( b^{275, 4}_2 ∧  b^{275, 4}_1 ∧  b^{275, 4}_0 ∧ true) 
c  in CNF:
c    -b^{275, 4}_2 ∨ -b^{275, 4}_1 ∨ -b^{275, 4}_0 ∨ false 
c  in DIMACS:
-23174 -23175 -23176  0

c INIT for k = 276
c    -b^{276, 1}_2
c    -b^{276, 1}_1
c    -b^{276, 1}_0
c  in DIMACS:
-23180 0
-23181 0
-23182 0

c Transitions for k = 276
c i = 1
c  -2+1 --> -1
c    ( b^{276, 1}_2 ∧  b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧  p_276) -> ( b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0)
c  in CNF:
c    -b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨  b^{276, 2}_2
c    -b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_1
c    -b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨  b^{276, 2}_0
c  in DIMACS:
-23180 -23181  23182 -276  23183 0
-23180 -23181  23182 -276 -23184 0
-23180 -23181  23182 -276  23185 0

c  -1+1 --> 0
c    ( b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧  b^{276, 1}_0 ∧  p_276) -> (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧ -b^{276, 2}_0)
c  in CNF:
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_2
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_1
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_0
c  in DIMACS:
-23180  23181 -23182 -276 -23183 0
-23180  23181 -23182 -276 -23184 0
-23180  23181 -23182 -276 -23185 0

c  0+1 --> 1
c    (-b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧  p_276) -> (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0)
c  in CNF:
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_2
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_1
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨  b^{276, 2}_0
c  in DIMACS:
 23180  23181  23182 -276 -23183 0
 23180  23181  23182 -276 -23184 0
 23180  23181  23182 -276  23185 0

c  1+1 --> 2
c    (-b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧  b^{276, 1}_0 ∧  p_276) -> (-b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0)
c  in CNF:
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_2
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨  b^{276, 2}_1
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ -p_276 ∨ -b^{276, 2}_0
c  in DIMACS:
 23180  23181 -23182 -276 -23183 0
 23180  23181 -23182 -276  23184 0
 23180  23181 -23182 -276 -23185 0

c  2+1 --> break 
c    (-b^{276, 1}_2 ∧  b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧  p_276) -> break
c  in CNF:
c     b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ -p_276 ∨ break
c  in DIMACS:
 23180 -23181  23182 -276 1162 0


c  2-1 --> 1
c    (-b^{276, 1}_2 ∧  b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧ -p_276) -> (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0)
c  in CNF:
c     b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_2
c     b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_1
c     b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨  b^{276, 2}_0
c  in DIMACS:
 23180 -23181  23182  276 -23183 0
 23180 -23181  23182  276 -23184 0
 23180 -23181  23182  276  23185 0

c  1-1 --> 0
c    (-b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧  b^{276, 1}_0 ∧ -p_276) -> (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧ -b^{276, 2}_0)
c  in CNF:
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_2
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_1
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_0
c  in DIMACS:
 23180  23181 -23182  276 -23183 0
 23180  23181 -23182  276 -23184 0
 23180  23181 -23182  276 -23185 0

c  0-1 --> -1
c    (-b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧ -p_276) -> ( b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0)
c  in CNF:
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨  b^{276, 2}_2
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_1
c     b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨  b^{276, 2}_0
c  in DIMACS:
 23180  23181  23182  276  23183 0
 23180  23181  23182  276 -23184 0
 23180  23181  23182  276  23185 0

c  -1-1 --> -2
c    ( b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧  b^{276, 1}_0 ∧ -p_276) -> ( b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0)
c  in CNF:
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨  b^{276, 2}_2
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨  b^{276, 2}_1
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨  p_276 ∨ -b^{276, 2}_0
c  in DIMACS:
-23180  23181 -23182  276  23183 0
-23180  23181 -23182  276  23184 0
-23180  23181 -23182  276 -23185 0

c  -2-1 --> break 
c    ( b^{276, 1}_2 ∧  b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧ -p_276) -> break
c  in CNF:
c    -b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨  b^{276, 1}_0 ∨  p_276 ∨ break
c  in DIMACS:
-23180 -23181  23182  276 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{276, 1}_2 ∧ -b^{276, 1}_1 ∧ -b^{276, 1}_0 ∧ true) 
c  in CNF:
c    -b^{276, 1}_2 ∨  b^{276, 1}_1 ∨  b^{276, 1}_0 ∨ false 
c  in DIMACS:
-23180  23181  23182  0

c  3 does not represent an automaton state.
c    -(-b^{276, 1}_2 ∧  b^{276, 1}_1 ∧  b^{276, 1}_0 ∧ true) 
c  in CNF:
c     b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ false 
c  in DIMACS:
 23180 -23181 -23182  0
c  -3 does not represent an automaton state.
c    -( b^{276, 1}_2 ∧  b^{276, 1}_1 ∧  b^{276, 1}_0 ∧ true) 
c  in CNF:
c    -b^{276, 1}_2 ∨ -b^{276, 1}_1 ∨ -b^{276, 1}_0 ∨ false 
c  in DIMACS:
-23180 -23181 -23182  0

c i = 2
c  -2+1 --> -1
c    ( b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧  p_552) -> ( b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0)
c  in CNF:
c    -b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨  b^{276, 3}_2
c    -b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_1
c    -b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨  b^{276, 3}_0
c  in DIMACS:
-23183 -23184  23185 -552  23186 0
-23183 -23184  23185 -552 -23187 0
-23183 -23184  23185 -552  23188 0

c  -1+1 --> 0
c    ( b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0 ∧  p_552) -> (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧ -b^{276, 3}_0)
c  in CNF:
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_2
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_1
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_0
c  in DIMACS:
-23183  23184 -23185 -552 -23186 0
-23183  23184 -23185 -552 -23187 0
-23183  23184 -23185 -552 -23188 0

c  0+1 --> 1
c    (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧  p_552) -> (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0)
c  in CNF:
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_2
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_1
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨  b^{276, 3}_0
c  in DIMACS:
 23183  23184  23185 -552 -23186 0
 23183  23184  23185 -552 -23187 0
 23183  23184  23185 -552  23188 0

c  1+1 --> 2
c    (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0 ∧  p_552) -> (-b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0)
c  in CNF:
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_2
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨  b^{276, 3}_1
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ -p_552 ∨ -b^{276, 3}_0
c  in DIMACS:
 23183  23184 -23185 -552 -23186 0
 23183  23184 -23185 -552  23187 0
 23183  23184 -23185 -552 -23188 0

c  2+1 --> break 
c    (-b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧  p_552) -> break
c  in CNF:
c     b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ -p_552 ∨ break
c  in DIMACS:
 23183 -23184  23185 -552 1162 0


c  2-1 --> 1
c    (-b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧ -p_552) -> (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0)
c  in CNF:
c     b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_2
c     b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_1
c     b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨  b^{276, 3}_0
c  in DIMACS:
 23183 -23184  23185  552 -23186 0
 23183 -23184  23185  552 -23187 0
 23183 -23184  23185  552  23188 0

c  1-1 --> 0
c    (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0 ∧ -p_552) -> (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧ -b^{276, 3}_0)
c  in CNF:
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_2
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_1
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_0
c  in DIMACS:
 23183  23184 -23185  552 -23186 0
 23183  23184 -23185  552 -23187 0
 23183  23184 -23185  552 -23188 0

c  0-1 --> -1
c    (-b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧ -p_552) -> ( b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0)
c  in CNF:
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨  b^{276, 3}_2
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_1
c     b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨  b^{276, 3}_0
c  in DIMACS:
 23183  23184  23185  552  23186 0
 23183  23184  23185  552 -23187 0
 23183  23184  23185  552  23188 0

c  -1-1 --> -2
c    ( b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧  b^{276, 2}_0 ∧ -p_552) -> ( b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0)
c  in CNF:
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨  b^{276, 3}_2
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨  b^{276, 3}_1
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨  p_552 ∨ -b^{276, 3}_0
c  in DIMACS:
-23183  23184 -23185  552  23186 0
-23183  23184 -23185  552  23187 0
-23183  23184 -23185  552 -23188 0

c  -2-1 --> break 
c    ( b^{276, 2}_2 ∧  b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧ -p_552) -> break
c  in CNF:
c    -b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨  b^{276, 2}_0 ∨  p_552 ∨ break
c  in DIMACS:
-23183 -23184  23185  552 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{276, 2}_2 ∧ -b^{276, 2}_1 ∧ -b^{276, 2}_0 ∧ true) 
c  in CNF:
c    -b^{276, 2}_2 ∨  b^{276, 2}_1 ∨  b^{276, 2}_0 ∨ false 
c  in DIMACS:
-23183  23184  23185  0

c  3 does not represent an automaton state.
c    -(-b^{276, 2}_2 ∧  b^{276, 2}_1 ∧  b^{276, 2}_0 ∧ true) 
c  in CNF:
c     b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ false 
c  in DIMACS:
 23183 -23184 -23185  0
c  -3 does not represent an automaton state.
c    -( b^{276, 2}_2 ∧  b^{276, 2}_1 ∧  b^{276, 2}_0 ∧ true) 
c  in CNF:
c    -b^{276, 2}_2 ∨ -b^{276, 2}_1 ∨ -b^{276, 2}_0 ∨ false 
c  in DIMACS:
-23183 -23184 -23185  0

c i = 3
c  -2+1 --> -1
c    ( b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧  p_828) -> ( b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0)
c  in CNF:
c    -b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨  b^{276, 4}_2
c    -b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_1
c    -b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨  b^{276, 4}_0
c  in DIMACS:
-23186 -23187  23188 -828  23189 0
-23186 -23187  23188 -828 -23190 0
-23186 -23187  23188 -828  23191 0

c  -1+1 --> 0
c    ( b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0 ∧  p_828) -> (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧ -b^{276, 4}_0)
c  in CNF:
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_2
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_1
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_0
c  in DIMACS:
-23186  23187 -23188 -828 -23189 0
-23186  23187 -23188 -828 -23190 0
-23186  23187 -23188 -828 -23191 0

c  0+1 --> 1
c    (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧  p_828) -> (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0)
c  in CNF:
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_2
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_1
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨  b^{276, 4}_0
c  in DIMACS:
 23186  23187  23188 -828 -23189 0
 23186  23187  23188 -828 -23190 0
 23186  23187  23188 -828  23191 0

c  1+1 --> 2
c    (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0 ∧  p_828) -> (-b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0)
c  in CNF:
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_2
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨  b^{276, 4}_1
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ -p_828 ∨ -b^{276, 4}_0
c  in DIMACS:
 23186  23187 -23188 -828 -23189 0
 23186  23187 -23188 -828  23190 0
 23186  23187 -23188 -828 -23191 0

c  2+1 --> break 
c    (-b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧  p_828) -> break
c  in CNF:
c     b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ -p_828 ∨ break
c  in DIMACS:
 23186 -23187  23188 -828 1162 0


c  2-1 --> 1
c    (-b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧ -p_828) -> (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0)
c  in CNF:
c     b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_2
c     b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_1
c     b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨  b^{276, 4}_0
c  in DIMACS:
 23186 -23187  23188  828 -23189 0
 23186 -23187  23188  828 -23190 0
 23186 -23187  23188  828  23191 0

c  1-1 --> 0
c    (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0 ∧ -p_828) -> (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧ -b^{276, 4}_0)
c  in CNF:
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_2
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_1
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_0
c  in DIMACS:
 23186  23187 -23188  828 -23189 0
 23186  23187 -23188  828 -23190 0
 23186  23187 -23188  828 -23191 0

c  0-1 --> -1
c    (-b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧ -p_828) -> ( b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0)
c  in CNF:
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨  b^{276, 4}_2
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_1
c     b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨  b^{276, 4}_0
c  in DIMACS:
 23186  23187  23188  828  23189 0
 23186  23187  23188  828 -23190 0
 23186  23187  23188  828  23191 0

c  -1-1 --> -2
c    ( b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧  b^{276, 3}_0 ∧ -p_828) -> ( b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0)
c  in CNF:
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨  b^{276, 4}_2
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨  b^{276, 4}_1
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨  p_828 ∨ -b^{276, 4}_0
c  in DIMACS:
-23186  23187 -23188  828  23189 0
-23186  23187 -23188  828  23190 0
-23186  23187 -23188  828 -23191 0

c  -2-1 --> break 
c    ( b^{276, 3}_2 ∧  b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧ -p_828) -> break
c  in CNF:
c    -b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨  b^{276, 3}_0 ∨  p_828 ∨ break
c  in DIMACS:
-23186 -23187  23188  828 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{276, 3}_2 ∧ -b^{276, 3}_1 ∧ -b^{276, 3}_0 ∧ true) 
c  in CNF:
c    -b^{276, 3}_2 ∨  b^{276, 3}_1 ∨  b^{276, 3}_0 ∨ false 
c  in DIMACS:
-23186  23187  23188  0

c  3 does not represent an automaton state.
c    -(-b^{276, 3}_2 ∧  b^{276, 3}_1 ∧  b^{276, 3}_0 ∧ true) 
c  in CNF:
c     b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ false 
c  in DIMACS:
 23186 -23187 -23188  0
c  -3 does not represent an automaton state.
c    -( b^{276, 3}_2 ∧  b^{276, 3}_1 ∧  b^{276, 3}_0 ∧ true) 
c  in CNF:
c    -b^{276, 3}_2 ∨ -b^{276, 3}_1 ∨ -b^{276, 3}_0 ∨ false 
c  in DIMACS:
-23186 -23187 -23188  0

c i = 4
c  -2+1 --> -1
c    ( b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧  p_1104) -> ( b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧  b^{276, 5}_0)
c  in CNF:
c    -b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨  b^{276, 5}_2
c    -b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_1
c    -b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨  b^{276, 5}_0
c  in DIMACS:
-23189 -23190  23191 -1104  23192 0
-23189 -23190  23191 -1104 -23193 0
-23189 -23190  23191 -1104  23194 0

c  -1+1 --> 0
c    ( b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0 ∧  p_1104) -> (-b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧ -b^{276, 5}_0)
c  in CNF:
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_2
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_1
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_0
c  in DIMACS:
-23189  23190 -23191 -1104 -23192 0
-23189  23190 -23191 -1104 -23193 0
-23189  23190 -23191 -1104 -23194 0

c  0+1 --> 1
c    (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧  p_1104) -> (-b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧  b^{276, 5}_0)
c  in CNF:
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_2
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_1
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨  b^{276, 5}_0
c  in DIMACS:
 23189  23190  23191 -1104 -23192 0
 23189  23190  23191 -1104 -23193 0
 23189  23190  23191 -1104  23194 0

c  1+1 --> 2
c    (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0 ∧  p_1104) -> (-b^{276, 5}_2 ∧  b^{276, 5}_1 ∧ -b^{276, 5}_0)
c  in CNF:
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_2
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨  b^{276, 5}_1
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ -p_1104 ∨ -b^{276, 5}_0
c  in DIMACS:
 23189  23190 -23191 -1104 -23192 0
 23189  23190 -23191 -1104  23193 0
 23189  23190 -23191 -1104 -23194 0

c  2+1 --> break 
c    (-b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 23189 -23190  23191 -1104 1162 0


c  2-1 --> 1
c    (-b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧ -p_1104) -> (-b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧  b^{276, 5}_0)
c  in CNF:
c     b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_2
c     b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_1
c     b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨  b^{276, 5}_0
c  in DIMACS:
 23189 -23190  23191  1104 -23192 0
 23189 -23190  23191  1104 -23193 0
 23189 -23190  23191  1104  23194 0

c  1-1 --> 0
c    (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0 ∧ -p_1104) -> (-b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧ -b^{276, 5}_0)
c  in CNF:
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_2
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_1
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_0
c  in DIMACS:
 23189  23190 -23191  1104 -23192 0
 23189  23190 -23191  1104 -23193 0
 23189  23190 -23191  1104 -23194 0

c  0-1 --> -1
c    (-b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧ -p_1104) -> ( b^{276, 5}_2 ∧ -b^{276, 5}_1 ∧  b^{276, 5}_0)
c  in CNF:
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨  b^{276, 5}_2
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_1
c     b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨  b^{276, 5}_0
c  in DIMACS:
 23189  23190  23191  1104  23192 0
 23189  23190  23191  1104 -23193 0
 23189  23190  23191  1104  23194 0

c  -1-1 --> -2
c    ( b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧  b^{276, 4}_0 ∧ -p_1104) -> ( b^{276, 5}_2 ∧  b^{276, 5}_1 ∧ -b^{276, 5}_0)
c  in CNF:
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨  b^{276, 5}_2
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨  b^{276, 5}_1
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨  p_1104 ∨ -b^{276, 5}_0
c  in DIMACS:
-23189  23190 -23191  1104  23192 0
-23189  23190 -23191  1104  23193 0
-23189  23190 -23191  1104 -23194 0

c  -2-1 --> break 
c    ( b^{276, 4}_2 ∧  b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨  b^{276, 4}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-23189 -23190  23191  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{276, 4}_2 ∧ -b^{276, 4}_1 ∧ -b^{276, 4}_0 ∧ true) 
c  in CNF:
c    -b^{276, 4}_2 ∨  b^{276, 4}_1 ∨  b^{276, 4}_0 ∨ false 
c  in DIMACS:
-23189  23190  23191  0

c  3 does not represent an automaton state.
c    -(-b^{276, 4}_2 ∧  b^{276, 4}_1 ∧  b^{276, 4}_0 ∧ true) 
c  in CNF:
c     b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ false 
c  in DIMACS:
 23189 -23190 -23191  0
c  -3 does not represent an automaton state.
c    -( b^{276, 4}_2 ∧  b^{276, 4}_1 ∧  b^{276, 4}_0 ∧ true) 
c  in CNF:
c    -b^{276, 4}_2 ∨ -b^{276, 4}_1 ∨ -b^{276, 4}_0 ∨ false 
c  in DIMACS:
-23189 -23190 -23191  0

c INIT for k = 277
c    -b^{277, 1}_2
c    -b^{277, 1}_1
c    -b^{277, 1}_0
c  in DIMACS:
-23195 0
-23196 0
-23197 0

c Transitions for k = 277
c i = 1
c  -2+1 --> -1
c    ( b^{277, 1}_2 ∧  b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧  p_277) -> ( b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0)
c  in CNF:
c    -b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨  b^{277, 2}_2
c    -b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_1
c    -b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨  b^{277, 2}_0
c  in DIMACS:
-23195 -23196  23197 -277  23198 0
-23195 -23196  23197 -277 -23199 0
-23195 -23196  23197 -277  23200 0

c  -1+1 --> 0
c    ( b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧  b^{277, 1}_0 ∧  p_277) -> (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧ -b^{277, 2}_0)
c  in CNF:
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_2
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_1
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_0
c  in DIMACS:
-23195  23196 -23197 -277 -23198 0
-23195  23196 -23197 -277 -23199 0
-23195  23196 -23197 -277 -23200 0

c  0+1 --> 1
c    (-b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧  p_277) -> (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0)
c  in CNF:
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_2
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_1
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨  b^{277, 2}_0
c  in DIMACS:
 23195  23196  23197 -277 -23198 0
 23195  23196  23197 -277 -23199 0
 23195  23196  23197 -277  23200 0

c  1+1 --> 2
c    (-b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧  b^{277, 1}_0 ∧  p_277) -> (-b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0)
c  in CNF:
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_2
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨  b^{277, 2}_1
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ -p_277 ∨ -b^{277, 2}_0
c  in DIMACS:
 23195  23196 -23197 -277 -23198 0
 23195  23196 -23197 -277  23199 0
 23195  23196 -23197 -277 -23200 0

c  2+1 --> break 
c    (-b^{277, 1}_2 ∧  b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧  p_277) -> break
c  in CNF:
c     b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ -p_277 ∨ break
c  in DIMACS:
 23195 -23196  23197 -277 1162 0


c  2-1 --> 1
c    (-b^{277, 1}_2 ∧  b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧ -p_277) -> (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0)
c  in CNF:
c     b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_2
c     b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_1
c     b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨  b^{277, 2}_0
c  in DIMACS:
 23195 -23196  23197  277 -23198 0
 23195 -23196  23197  277 -23199 0
 23195 -23196  23197  277  23200 0

c  1-1 --> 0
c    (-b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧  b^{277, 1}_0 ∧ -p_277) -> (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧ -b^{277, 2}_0)
c  in CNF:
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_2
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_1
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_0
c  in DIMACS:
 23195  23196 -23197  277 -23198 0
 23195  23196 -23197  277 -23199 0
 23195  23196 -23197  277 -23200 0

c  0-1 --> -1
c    (-b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧ -p_277) -> ( b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0)
c  in CNF:
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨  b^{277, 2}_2
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_1
c     b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨  b^{277, 2}_0
c  in DIMACS:
 23195  23196  23197  277  23198 0
 23195  23196  23197  277 -23199 0
 23195  23196  23197  277  23200 0

c  -1-1 --> -2
c    ( b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧  b^{277, 1}_0 ∧ -p_277) -> ( b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0)
c  in CNF:
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨  b^{277, 2}_2
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨  b^{277, 2}_1
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨  p_277 ∨ -b^{277, 2}_0
c  in DIMACS:
-23195  23196 -23197  277  23198 0
-23195  23196 -23197  277  23199 0
-23195  23196 -23197  277 -23200 0

c  -2-1 --> break 
c    ( b^{277, 1}_2 ∧  b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧ -p_277) -> break
c  in CNF:
c    -b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨  b^{277, 1}_0 ∨  p_277 ∨ break
c  in DIMACS:
-23195 -23196  23197  277 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{277, 1}_2 ∧ -b^{277, 1}_1 ∧ -b^{277, 1}_0 ∧ true) 
c  in CNF:
c    -b^{277, 1}_2 ∨  b^{277, 1}_1 ∨  b^{277, 1}_0 ∨ false 
c  in DIMACS:
-23195  23196  23197  0

c  3 does not represent an automaton state.
c    -(-b^{277, 1}_2 ∧  b^{277, 1}_1 ∧  b^{277, 1}_0 ∧ true) 
c  in CNF:
c     b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ false 
c  in DIMACS:
 23195 -23196 -23197  0
c  -3 does not represent an automaton state.
c    -( b^{277, 1}_2 ∧  b^{277, 1}_1 ∧  b^{277, 1}_0 ∧ true) 
c  in CNF:
c    -b^{277, 1}_2 ∨ -b^{277, 1}_1 ∨ -b^{277, 1}_0 ∨ false 
c  in DIMACS:
-23195 -23196 -23197  0

c i = 2
c  -2+1 --> -1
c    ( b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧  p_554) -> ( b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0)
c  in CNF:
c    -b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨  b^{277, 3}_2
c    -b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_1
c    -b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨  b^{277, 3}_0
c  in DIMACS:
-23198 -23199  23200 -554  23201 0
-23198 -23199  23200 -554 -23202 0
-23198 -23199  23200 -554  23203 0

c  -1+1 --> 0
c    ( b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0 ∧  p_554) -> (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧ -b^{277, 3}_0)
c  in CNF:
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_2
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_1
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_0
c  in DIMACS:
-23198  23199 -23200 -554 -23201 0
-23198  23199 -23200 -554 -23202 0
-23198  23199 -23200 -554 -23203 0

c  0+1 --> 1
c    (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧  p_554) -> (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0)
c  in CNF:
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_2
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_1
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨  b^{277, 3}_0
c  in DIMACS:
 23198  23199  23200 -554 -23201 0
 23198  23199  23200 -554 -23202 0
 23198  23199  23200 -554  23203 0

c  1+1 --> 2
c    (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0 ∧  p_554) -> (-b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0)
c  in CNF:
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_2
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨  b^{277, 3}_1
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ -p_554 ∨ -b^{277, 3}_0
c  in DIMACS:
 23198  23199 -23200 -554 -23201 0
 23198  23199 -23200 -554  23202 0
 23198  23199 -23200 -554 -23203 0

c  2+1 --> break 
c    (-b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧  p_554) -> break
c  in CNF:
c     b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ -p_554 ∨ break
c  in DIMACS:
 23198 -23199  23200 -554 1162 0


c  2-1 --> 1
c    (-b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧ -p_554) -> (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0)
c  in CNF:
c     b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_2
c     b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_1
c     b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨  b^{277, 3}_0
c  in DIMACS:
 23198 -23199  23200  554 -23201 0
 23198 -23199  23200  554 -23202 0
 23198 -23199  23200  554  23203 0

c  1-1 --> 0
c    (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0 ∧ -p_554) -> (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧ -b^{277, 3}_0)
c  in CNF:
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_2
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_1
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_0
c  in DIMACS:
 23198  23199 -23200  554 -23201 0
 23198  23199 -23200  554 -23202 0
 23198  23199 -23200  554 -23203 0

c  0-1 --> -1
c    (-b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧ -p_554) -> ( b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0)
c  in CNF:
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨  b^{277, 3}_2
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_1
c     b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨  b^{277, 3}_0
c  in DIMACS:
 23198  23199  23200  554  23201 0
 23198  23199  23200  554 -23202 0
 23198  23199  23200  554  23203 0

c  -1-1 --> -2
c    ( b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧  b^{277, 2}_0 ∧ -p_554) -> ( b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0)
c  in CNF:
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨  b^{277, 3}_2
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨  b^{277, 3}_1
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨  p_554 ∨ -b^{277, 3}_0
c  in DIMACS:
-23198  23199 -23200  554  23201 0
-23198  23199 -23200  554  23202 0
-23198  23199 -23200  554 -23203 0

c  -2-1 --> break 
c    ( b^{277, 2}_2 ∧  b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧ -p_554) -> break
c  in CNF:
c    -b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨  b^{277, 2}_0 ∨  p_554 ∨ break
c  in DIMACS:
-23198 -23199  23200  554 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{277, 2}_2 ∧ -b^{277, 2}_1 ∧ -b^{277, 2}_0 ∧ true) 
c  in CNF:
c    -b^{277, 2}_2 ∨  b^{277, 2}_1 ∨  b^{277, 2}_0 ∨ false 
c  in DIMACS:
-23198  23199  23200  0

c  3 does not represent an automaton state.
c    -(-b^{277, 2}_2 ∧  b^{277, 2}_1 ∧  b^{277, 2}_0 ∧ true) 
c  in CNF:
c     b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ false 
c  in DIMACS:
 23198 -23199 -23200  0
c  -3 does not represent an automaton state.
c    -( b^{277, 2}_2 ∧  b^{277, 2}_1 ∧  b^{277, 2}_0 ∧ true) 
c  in CNF:
c    -b^{277, 2}_2 ∨ -b^{277, 2}_1 ∨ -b^{277, 2}_0 ∨ false 
c  in DIMACS:
-23198 -23199 -23200  0

c i = 3
c  -2+1 --> -1
c    ( b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧  p_831) -> ( b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0)
c  in CNF:
c    -b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨  b^{277, 4}_2
c    -b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_1
c    -b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨  b^{277, 4}_0
c  in DIMACS:
-23201 -23202  23203 -831  23204 0
-23201 -23202  23203 -831 -23205 0
-23201 -23202  23203 -831  23206 0

c  -1+1 --> 0
c    ( b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0 ∧  p_831) -> (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧ -b^{277, 4}_0)
c  in CNF:
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_2
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_1
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_0
c  in DIMACS:
-23201  23202 -23203 -831 -23204 0
-23201  23202 -23203 -831 -23205 0
-23201  23202 -23203 -831 -23206 0

c  0+1 --> 1
c    (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧  p_831) -> (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0)
c  in CNF:
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_2
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_1
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨  b^{277, 4}_0
c  in DIMACS:
 23201  23202  23203 -831 -23204 0
 23201  23202  23203 -831 -23205 0
 23201  23202  23203 -831  23206 0

c  1+1 --> 2
c    (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0 ∧  p_831) -> (-b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0)
c  in CNF:
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_2
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨  b^{277, 4}_1
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ -p_831 ∨ -b^{277, 4}_0
c  in DIMACS:
 23201  23202 -23203 -831 -23204 0
 23201  23202 -23203 -831  23205 0
 23201  23202 -23203 -831 -23206 0

c  2+1 --> break 
c    (-b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧  p_831) -> break
c  in CNF:
c     b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ -p_831 ∨ break
c  in DIMACS:
 23201 -23202  23203 -831 1162 0


c  2-1 --> 1
c    (-b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧ -p_831) -> (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0)
c  in CNF:
c     b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_2
c     b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_1
c     b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨  b^{277, 4}_0
c  in DIMACS:
 23201 -23202  23203  831 -23204 0
 23201 -23202  23203  831 -23205 0
 23201 -23202  23203  831  23206 0

c  1-1 --> 0
c    (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0 ∧ -p_831) -> (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧ -b^{277, 4}_0)
c  in CNF:
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_2
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_1
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_0
c  in DIMACS:
 23201  23202 -23203  831 -23204 0
 23201  23202 -23203  831 -23205 0
 23201  23202 -23203  831 -23206 0

c  0-1 --> -1
c    (-b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧ -p_831) -> ( b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0)
c  in CNF:
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨  b^{277, 4}_2
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_1
c     b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨  b^{277, 4}_0
c  in DIMACS:
 23201  23202  23203  831  23204 0
 23201  23202  23203  831 -23205 0
 23201  23202  23203  831  23206 0

c  -1-1 --> -2
c    ( b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧  b^{277, 3}_0 ∧ -p_831) -> ( b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0)
c  in CNF:
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨  b^{277, 4}_2
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨  b^{277, 4}_1
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨  p_831 ∨ -b^{277, 4}_0
c  in DIMACS:
-23201  23202 -23203  831  23204 0
-23201  23202 -23203  831  23205 0
-23201  23202 -23203  831 -23206 0

c  -2-1 --> break 
c    ( b^{277, 3}_2 ∧  b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧ -p_831) -> break
c  in CNF:
c    -b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨  b^{277, 3}_0 ∨  p_831 ∨ break
c  in DIMACS:
-23201 -23202  23203  831 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{277, 3}_2 ∧ -b^{277, 3}_1 ∧ -b^{277, 3}_0 ∧ true) 
c  in CNF:
c    -b^{277, 3}_2 ∨  b^{277, 3}_1 ∨  b^{277, 3}_0 ∨ false 
c  in DIMACS:
-23201  23202  23203  0

c  3 does not represent an automaton state.
c    -(-b^{277, 3}_2 ∧  b^{277, 3}_1 ∧  b^{277, 3}_0 ∧ true) 
c  in CNF:
c     b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ false 
c  in DIMACS:
 23201 -23202 -23203  0
c  -3 does not represent an automaton state.
c    -( b^{277, 3}_2 ∧  b^{277, 3}_1 ∧  b^{277, 3}_0 ∧ true) 
c  in CNF:
c    -b^{277, 3}_2 ∨ -b^{277, 3}_1 ∨ -b^{277, 3}_0 ∨ false 
c  in DIMACS:
-23201 -23202 -23203  0

c i = 4
c  -2+1 --> -1
c    ( b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧  p_1108) -> ( b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧  b^{277, 5}_0)
c  in CNF:
c    -b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨  b^{277, 5}_2
c    -b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_1
c    -b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨  b^{277, 5}_0
c  in DIMACS:
-23204 -23205  23206 -1108  23207 0
-23204 -23205  23206 -1108 -23208 0
-23204 -23205  23206 -1108  23209 0

c  -1+1 --> 0
c    ( b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0 ∧  p_1108) -> (-b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧ -b^{277, 5}_0)
c  in CNF:
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_2
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_1
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_0
c  in DIMACS:
-23204  23205 -23206 -1108 -23207 0
-23204  23205 -23206 -1108 -23208 0
-23204  23205 -23206 -1108 -23209 0

c  0+1 --> 1
c    (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧  p_1108) -> (-b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧  b^{277, 5}_0)
c  in CNF:
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_2
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_1
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨  b^{277, 5}_0
c  in DIMACS:
 23204  23205  23206 -1108 -23207 0
 23204  23205  23206 -1108 -23208 0
 23204  23205  23206 -1108  23209 0

c  1+1 --> 2
c    (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0 ∧  p_1108) -> (-b^{277, 5}_2 ∧  b^{277, 5}_1 ∧ -b^{277, 5}_0)
c  in CNF:
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_2
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨  b^{277, 5}_1
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ -p_1108 ∨ -b^{277, 5}_0
c  in DIMACS:
 23204  23205 -23206 -1108 -23207 0
 23204  23205 -23206 -1108  23208 0
 23204  23205 -23206 -1108 -23209 0

c  2+1 --> break 
c    (-b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧  p_1108) -> break
c  in CNF:
c     b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ -p_1108 ∨ break
c  in DIMACS:
 23204 -23205  23206 -1108 1162 0


c  2-1 --> 1
c    (-b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧ -p_1108) -> (-b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧  b^{277, 5}_0)
c  in CNF:
c     b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_2
c     b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_1
c     b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨  b^{277, 5}_0
c  in DIMACS:
 23204 -23205  23206  1108 -23207 0
 23204 -23205  23206  1108 -23208 0
 23204 -23205  23206  1108  23209 0

c  1-1 --> 0
c    (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0 ∧ -p_1108) -> (-b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧ -b^{277, 5}_0)
c  in CNF:
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_2
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_1
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_0
c  in DIMACS:
 23204  23205 -23206  1108 -23207 0
 23204  23205 -23206  1108 -23208 0
 23204  23205 -23206  1108 -23209 0

c  0-1 --> -1
c    (-b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧ -p_1108) -> ( b^{277, 5}_2 ∧ -b^{277, 5}_1 ∧  b^{277, 5}_0)
c  in CNF:
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨  b^{277, 5}_2
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_1
c     b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨  b^{277, 5}_0
c  in DIMACS:
 23204  23205  23206  1108  23207 0
 23204  23205  23206  1108 -23208 0
 23204  23205  23206  1108  23209 0

c  -1-1 --> -2
c    ( b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧  b^{277, 4}_0 ∧ -p_1108) -> ( b^{277, 5}_2 ∧  b^{277, 5}_1 ∧ -b^{277, 5}_0)
c  in CNF:
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨  b^{277, 5}_2
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨  b^{277, 5}_1
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨  p_1108 ∨ -b^{277, 5}_0
c  in DIMACS:
-23204  23205 -23206  1108  23207 0
-23204  23205 -23206  1108  23208 0
-23204  23205 -23206  1108 -23209 0

c  -2-1 --> break 
c    ( b^{277, 4}_2 ∧  b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧ -p_1108) -> break
c  in CNF:
c    -b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨  b^{277, 4}_0 ∨  p_1108 ∨ break
c  in DIMACS:
-23204 -23205  23206  1108 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{277, 4}_2 ∧ -b^{277, 4}_1 ∧ -b^{277, 4}_0 ∧ true) 
c  in CNF:
c    -b^{277, 4}_2 ∨  b^{277, 4}_1 ∨  b^{277, 4}_0 ∨ false 
c  in DIMACS:
-23204  23205  23206  0

c  3 does not represent an automaton state.
c    -(-b^{277, 4}_2 ∧  b^{277, 4}_1 ∧  b^{277, 4}_0 ∧ true) 
c  in CNF:
c     b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ false 
c  in DIMACS:
 23204 -23205 -23206  0
c  -3 does not represent an automaton state.
c    -( b^{277, 4}_2 ∧  b^{277, 4}_1 ∧  b^{277, 4}_0 ∧ true) 
c  in CNF:
c    -b^{277, 4}_2 ∨ -b^{277, 4}_1 ∨ -b^{277, 4}_0 ∨ false 
c  in DIMACS:
-23204 -23205 -23206  0

c INIT for k = 278
c    -b^{278, 1}_2
c    -b^{278, 1}_1
c    -b^{278, 1}_0
c  in DIMACS:
-23210 0
-23211 0
-23212 0

c Transitions for k = 278
c i = 1
c  -2+1 --> -1
c    ( b^{278, 1}_2 ∧  b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧  p_278) -> ( b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0)
c  in CNF:
c    -b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨  b^{278, 2}_2
c    -b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_1
c    -b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨  b^{278, 2}_0
c  in DIMACS:
-23210 -23211  23212 -278  23213 0
-23210 -23211  23212 -278 -23214 0
-23210 -23211  23212 -278  23215 0

c  -1+1 --> 0
c    ( b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧  b^{278, 1}_0 ∧  p_278) -> (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧ -b^{278, 2}_0)
c  in CNF:
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_2
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_1
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_0
c  in DIMACS:
-23210  23211 -23212 -278 -23213 0
-23210  23211 -23212 -278 -23214 0
-23210  23211 -23212 -278 -23215 0

c  0+1 --> 1
c    (-b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧  p_278) -> (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0)
c  in CNF:
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_2
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_1
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨  b^{278, 2}_0
c  in DIMACS:
 23210  23211  23212 -278 -23213 0
 23210  23211  23212 -278 -23214 0
 23210  23211  23212 -278  23215 0

c  1+1 --> 2
c    (-b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧  b^{278, 1}_0 ∧  p_278) -> (-b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0)
c  in CNF:
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_2
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨  b^{278, 2}_1
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ -p_278 ∨ -b^{278, 2}_0
c  in DIMACS:
 23210  23211 -23212 -278 -23213 0
 23210  23211 -23212 -278  23214 0
 23210  23211 -23212 -278 -23215 0

c  2+1 --> break 
c    (-b^{278, 1}_2 ∧  b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧  p_278) -> break
c  in CNF:
c     b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ -p_278 ∨ break
c  in DIMACS:
 23210 -23211  23212 -278 1162 0


c  2-1 --> 1
c    (-b^{278, 1}_2 ∧  b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧ -p_278) -> (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0)
c  in CNF:
c     b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_2
c     b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_1
c     b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨  b^{278, 2}_0
c  in DIMACS:
 23210 -23211  23212  278 -23213 0
 23210 -23211  23212  278 -23214 0
 23210 -23211  23212  278  23215 0

c  1-1 --> 0
c    (-b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧  b^{278, 1}_0 ∧ -p_278) -> (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧ -b^{278, 2}_0)
c  in CNF:
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_2
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_1
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_0
c  in DIMACS:
 23210  23211 -23212  278 -23213 0
 23210  23211 -23212  278 -23214 0
 23210  23211 -23212  278 -23215 0

c  0-1 --> -1
c    (-b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧ -p_278) -> ( b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0)
c  in CNF:
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨  b^{278, 2}_2
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_1
c     b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨  b^{278, 2}_0
c  in DIMACS:
 23210  23211  23212  278  23213 0
 23210  23211  23212  278 -23214 0
 23210  23211  23212  278  23215 0

c  -1-1 --> -2
c    ( b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧  b^{278, 1}_0 ∧ -p_278) -> ( b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0)
c  in CNF:
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨  b^{278, 2}_2
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨  b^{278, 2}_1
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨  p_278 ∨ -b^{278, 2}_0
c  in DIMACS:
-23210  23211 -23212  278  23213 0
-23210  23211 -23212  278  23214 0
-23210  23211 -23212  278 -23215 0

c  -2-1 --> break 
c    ( b^{278, 1}_2 ∧  b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧ -p_278) -> break
c  in CNF:
c    -b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨  b^{278, 1}_0 ∨  p_278 ∨ break
c  in DIMACS:
-23210 -23211  23212  278 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{278, 1}_2 ∧ -b^{278, 1}_1 ∧ -b^{278, 1}_0 ∧ true) 
c  in CNF:
c    -b^{278, 1}_2 ∨  b^{278, 1}_1 ∨  b^{278, 1}_0 ∨ false 
c  in DIMACS:
-23210  23211  23212  0

c  3 does not represent an automaton state.
c    -(-b^{278, 1}_2 ∧  b^{278, 1}_1 ∧  b^{278, 1}_0 ∧ true) 
c  in CNF:
c     b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ false 
c  in DIMACS:
 23210 -23211 -23212  0
c  -3 does not represent an automaton state.
c    -( b^{278, 1}_2 ∧  b^{278, 1}_1 ∧  b^{278, 1}_0 ∧ true) 
c  in CNF:
c    -b^{278, 1}_2 ∨ -b^{278, 1}_1 ∨ -b^{278, 1}_0 ∨ false 
c  in DIMACS:
-23210 -23211 -23212  0

c i = 2
c  -2+1 --> -1
c    ( b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧  p_556) -> ( b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0)
c  in CNF:
c    -b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨  b^{278, 3}_2
c    -b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_1
c    -b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨  b^{278, 3}_0
c  in DIMACS:
-23213 -23214  23215 -556  23216 0
-23213 -23214  23215 -556 -23217 0
-23213 -23214  23215 -556  23218 0

c  -1+1 --> 0
c    ( b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0 ∧  p_556) -> (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧ -b^{278, 3}_0)
c  in CNF:
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_2
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_1
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_0
c  in DIMACS:
-23213  23214 -23215 -556 -23216 0
-23213  23214 -23215 -556 -23217 0
-23213  23214 -23215 -556 -23218 0

c  0+1 --> 1
c    (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧  p_556) -> (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0)
c  in CNF:
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_2
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_1
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨  b^{278, 3}_0
c  in DIMACS:
 23213  23214  23215 -556 -23216 0
 23213  23214  23215 -556 -23217 0
 23213  23214  23215 -556  23218 0

c  1+1 --> 2
c    (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0 ∧  p_556) -> (-b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0)
c  in CNF:
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_2
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨  b^{278, 3}_1
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ -p_556 ∨ -b^{278, 3}_0
c  in DIMACS:
 23213  23214 -23215 -556 -23216 0
 23213  23214 -23215 -556  23217 0
 23213  23214 -23215 -556 -23218 0

c  2+1 --> break 
c    (-b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧  p_556) -> break
c  in CNF:
c     b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ -p_556 ∨ break
c  in DIMACS:
 23213 -23214  23215 -556 1162 0


c  2-1 --> 1
c    (-b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧ -p_556) -> (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0)
c  in CNF:
c     b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_2
c     b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_1
c     b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨  b^{278, 3}_0
c  in DIMACS:
 23213 -23214  23215  556 -23216 0
 23213 -23214  23215  556 -23217 0
 23213 -23214  23215  556  23218 0

c  1-1 --> 0
c    (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0 ∧ -p_556) -> (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧ -b^{278, 3}_0)
c  in CNF:
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_2
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_1
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_0
c  in DIMACS:
 23213  23214 -23215  556 -23216 0
 23213  23214 -23215  556 -23217 0
 23213  23214 -23215  556 -23218 0

c  0-1 --> -1
c    (-b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧ -p_556) -> ( b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0)
c  in CNF:
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨  b^{278, 3}_2
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_1
c     b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨  b^{278, 3}_0
c  in DIMACS:
 23213  23214  23215  556  23216 0
 23213  23214  23215  556 -23217 0
 23213  23214  23215  556  23218 0

c  -1-1 --> -2
c    ( b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧  b^{278, 2}_0 ∧ -p_556) -> ( b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0)
c  in CNF:
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨  b^{278, 3}_2
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨  b^{278, 3}_1
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨  p_556 ∨ -b^{278, 3}_0
c  in DIMACS:
-23213  23214 -23215  556  23216 0
-23213  23214 -23215  556  23217 0
-23213  23214 -23215  556 -23218 0

c  -2-1 --> break 
c    ( b^{278, 2}_2 ∧  b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧ -p_556) -> break
c  in CNF:
c    -b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨  b^{278, 2}_0 ∨  p_556 ∨ break
c  in DIMACS:
-23213 -23214  23215  556 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{278, 2}_2 ∧ -b^{278, 2}_1 ∧ -b^{278, 2}_0 ∧ true) 
c  in CNF:
c    -b^{278, 2}_2 ∨  b^{278, 2}_1 ∨  b^{278, 2}_0 ∨ false 
c  in DIMACS:
-23213  23214  23215  0

c  3 does not represent an automaton state.
c    -(-b^{278, 2}_2 ∧  b^{278, 2}_1 ∧  b^{278, 2}_0 ∧ true) 
c  in CNF:
c     b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ false 
c  in DIMACS:
 23213 -23214 -23215  0
c  -3 does not represent an automaton state.
c    -( b^{278, 2}_2 ∧  b^{278, 2}_1 ∧  b^{278, 2}_0 ∧ true) 
c  in CNF:
c    -b^{278, 2}_2 ∨ -b^{278, 2}_1 ∨ -b^{278, 2}_0 ∨ false 
c  in DIMACS:
-23213 -23214 -23215  0

c i = 3
c  -2+1 --> -1
c    ( b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧  p_834) -> ( b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0)
c  in CNF:
c    -b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨  b^{278, 4}_2
c    -b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_1
c    -b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨  b^{278, 4}_0
c  in DIMACS:
-23216 -23217  23218 -834  23219 0
-23216 -23217  23218 -834 -23220 0
-23216 -23217  23218 -834  23221 0

c  -1+1 --> 0
c    ( b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0 ∧  p_834) -> (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧ -b^{278, 4}_0)
c  in CNF:
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_2
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_1
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_0
c  in DIMACS:
-23216  23217 -23218 -834 -23219 0
-23216  23217 -23218 -834 -23220 0
-23216  23217 -23218 -834 -23221 0

c  0+1 --> 1
c    (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧  p_834) -> (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0)
c  in CNF:
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_2
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_1
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨  b^{278, 4}_0
c  in DIMACS:
 23216  23217  23218 -834 -23219 0
 23216  23217  23218 -834 -23220 0
 23216  23217  23218 -834  23221 0

c  1+1 --> 2
c    (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0 ∧  p_834) -> (-b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0)
c  in CNF:
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_2
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨  b^{278, 4}_1
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ -p_834 ∨ -b^{278, 4}_0
c  in DIMACS:
 23216  23217 -23218 -834 -23219 0
 23216  23217 -23218 -834  23220 0
 23216  23217 -23218 -834 -23221 0

c  2+1 --> break 
c    (-b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧  p_834) -> break
c  in CNF:
c     b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ -p_834 ∨ break
c  in DIMACS:
 23216 -23217  23218 -834 1162 0


c  2-1 --> 1
c    (-b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧ -p_834) -> (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0)
c  in CNF:
c     b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_2
c     b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_1
c     b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨  b^{278, 4}_0
c  in DIMACS:
 23216 -23217  23218  834 -23219 0
 23216 -23217  23218  834 -23220 0
 23216 -23217  23218  834  23221 0

c  1-1 --> 0
c    (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0 ∧ -p_834) -> (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧ -b^{278, 4}_0)
c  in CNF:
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_2
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_1
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_0
c  in DIMACS:
 23216  23217 -23218  834 -23219 0
 23216  23217 -23218  834 -23220 0
 23216  23217 -23218  834 -23221 0

c  0-1 --> -1
c    (-b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧ -p_834) -> ( b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0)
c  in CNF:
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨  b^{278, 4}_2
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_1
c     b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨  b^{278, 4}_0
c  in DIMACS:
 23216  23217  23218  834  23219 0
 23216  23217  23218  834 -23220 0
 23216  23217  23218  834  23221 0

c  -1-1 --> -2
c    ( b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧  b^{278, 3}_0 ∧ -p_834) -> ( b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0)
c  in CNF:
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨  b^{278, 4}_2
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨  b^{278, 4}_1
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨  p_834 ∨ -b^{278, 4}_0
c  in DIMACS:
-23216  23217 -23218  834  23219 0
-23216  23217 -23218  834  23220 0
-23216  23217 -23218  834 -23221 0

c  -2-1 --> break 
c    ( b^{278, 3}_2 ∧  b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧ -p_834) -> break
c  in CNF:
c    -b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨  b^{278, 3}_0 ∨  p_834 ∨ break
c  in DIMACS:
-23216 -23217  23218  834 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{278, 3}_2 ∧ -b^{278, 3}_1 ∧ -b^{278, 3}_0 ∧ true) 
c  in CNF:
c    -b^{278, 3}_2 ∨  b^{278, 3}_1 ∨  b^{278, 3}_0 ∨ false 
c  in DIMACS:
-23216  23217  23218  0

c  3 does not represent an automaton state.
c    -(-b^{278, 3}_2 ∧  b^{278, 3}_1 ∧  b^{278, 3}_0 ∧ true) 
c  in CNF:
c     b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ false 
c  in DIMACS:
 23216 -23217 -23218  0
c  -3 does not represent an automaton state.
c    -( b^{278, 3}_2 ∧  b^{278, 3}_1 ∧  b^{278, 3}_0 ∧ true) 
c  in CNF:
c    -b^{278, 3}_2 ∨ -b^{278, 3}_1 ∨ -b^{278, 3}_0 ∨ false 
c  in DIMACS:
-23216 -23217 -23218  0

c i = 4
c  -2+1 --> -1
c    ( b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧  p_1112) -> ( b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧  b^{278, 5}_0)
c  in CNF:
c    -b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨  b^{278, 5}_2
c    -b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_1
c    -b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨  b^{278, 5}_0
c  in DIMACS:
-23219 -23220  23221 -1112  23222 0
-23219 -23220  23221 -1112 -23223 0
-23219 -23220  23221 -1112  23224 0

c  -1+1 --> 0
c    ( b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0 ∧  p_1112) -> (-b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧ -b^{278, 5}_0)
c  in CNF:
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_2
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_1
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_0
c  in DIMACS:
-23219  23220 -23221 -1112 -23222 0
-23219  23220 -23221 -1112 -23223 0
-23219  23220 -23221 -1112 -23224 0

c  0+1 --> 1
c    (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧  p_1112) -> (-b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧  b^{278, 5}_0)
c  in CNF:
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_2
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_1
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨  b^{278, 5}_0
c  in DIMACS:
 23219  23220  23221 -1112 -23222 0
 23219  23220  23221 -1112 -23223 0
 23219  23220  23221 -1112  23224 0

c  1+1 --> 2
c    (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0 ∧  p_1112) -> (-b^{278, 5}_2 ∧  b^{278, 5}_1 ∧ -b^{278, 5}_0)
c  in CNF:
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_2
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨  b^{278, 5}_1
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ -p_1112 ∨ -b^{278, 5}_0
c  in DIMACS:
 23219  23220 -23221 -1112 -23222 0
 23219  23220 -23221 -1112  23223 0
 23219  23220 -23221 -1112 -23224 0

c  2+1 --> break 
c    (-b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧  p_1112) -> break
c  in CNF:
c     b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ -p_1112 ∨ break
c  in DIMACS:
 23219 -23220  23221 -1112 1162 0


c  2-1 --> 1
c    (-b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧ -p_1112) -> (-b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧  b^{278, 5}_0)
c  in CNF:
c     b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_2
c     b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_1
c     b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨  b^{278, 5}_0
c  in DIMACS:
 23219 -23220  23221  1112 -23222 0
 23219 -23220  23221  1112 -23223 0
 23219 -23220  23221  1112  23224 0

c  1-1 --> 0
c    (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0 ∧ -p_1112) -> (-b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧ -b^{278, 5}_0)
c  in CNF:
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_2
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_1
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_0
c  in DIMACS:
 23219  23220 -23221  1112 -23222 0
 23219  23220 -23221  1112 -23223 0
 23219  23220 -23221  1112 -23224 0

c  0-1 --> -1
c    (-b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧ -p_1112) -> ( b^{278, 5}_2 ∧ -b^{278, 5}_1 ∧  b^{278, 5}_0)
c  in CNF:
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨  b^{278, 5}_2
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_1
c     b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨  b^{278, 5}_0
c  in DIMACS:
 23219  23220  23221  1112  23222 0
 23219  23220  23221  1112 -23223 0
 23219  23220  23221  1112  23224 0

c  -1-1 --> -2
c    ( b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧  b^{278, 4}_0 ∧ -p_1112) -> ( b^{278, 5}_2 ∧  b^{278, 5}_1 ∧ -b^{278, 5}_0)
c  in CNF:
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨  b^{278, 5}_2
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨  b^{278, 5}_1
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨  p_1112 ∨ -b^{278, 5}_0
c  in DIMACS:
-23219  23220 -23221  1112  23222 0
-23219  23220 -23221  1112  23223 0
-23219  23220 -23221  1112 -23224 0

c  -2-1 --> break 
c    ( b^{278, 4}_2 ∧  b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧ -p_1112) -> break
c  in CNF:
c    -b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨  b^{278, 4}_0 ∨  p_1112 ∨ break
c  in DIMACS:
-23219 -23220  23221  1112 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{278, 4}_2 ∧ -b^{278, 4}_1 ∧ -b^{278, 4}_0 ∧ true) 
c  in CNF:
c    -b^{278, 4}_2 ∨  b^{278, 4}_1 ∨  b^{278, 4}_0 ∨ false 
c  in DIMACS:
-23219  23220  23221  0

c  3 does not represent an automaton state.
c    -(-b^{278, 4}_2 ∧  b^{278, 4}_1 ∧  b^{278, 4}_0 ∧ true) 
c  in CNF:
c     b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ false 
c  in DIMACS:
 23219 -23220 -23221  0
c  -3 does not represent an automaton state.
c    -( b^{278, 4}_2 ∧  b^{278, 4}_1 ∧  b^{278, 4}_0 ∧ true) 
c  in CNF:
c    -b^{278, 4}_2 ∨ -b^{278, 4}_1 ∨ -b^{278, 4}_0 ∨ false 
c  in DIMACS:
-23219 -23220 -23221  0

c INIT for k = 279
c    -b^{279, 1}_2
c    -b^{279, 1}_1
c    -b^{279, 1}_0
c  in DIMACS:
-23225 0
-23226 0
-23227 0

c Transitions for k = 279
c i = 1
c  -2+1 --> -1
c    ( b^{279, 1}_2 ∧  b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧  p_279) -> ( b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0)
c  in CNF:
c    -b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨  b^{279, 2}_2
c    -b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_1
c    -b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨  b^{279, 2}_0
c  in DIMACS:
-23225 -23226  23227 -279  23228 0
-23225 -23226  23227 -279 -23229 0
-23225 -23226  23227 -279  23230 0

c  -1+1 --> 0
c    ( b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧  b^{279, 1}_0 ∧  p_279) -> (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧ -b^{279, 2}_0)
c  in CNF:
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_2
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_1
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_0
c  in DIMACS:
-23225  23226 -23227 -279 -23228 0
-23225  23226 -23227 -279 -23229 0
-23225  23226 -23227 -279 -23230 0

c  0+1 --> 1
c    (-b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧  p_279) -> (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0)
c  in CNF:
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_2
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_1
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨  b^{279, 2}_0
c  in DIMACS:
 23225  23226  23227 -279 -23228 0
 23225  23226  23227 -279 -23229 0
 23225  23226  23227 -279  23230 0

c  1+1 --> 2
c    (-b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧  b^{279, 1}_0 ∧  p_279) -> (-b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0)
c  in CNF:
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_2
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨  b^{279, 2}_1
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ -p_279 ∨ -b^{279, 2}_0
c  in DIMACS:
 23225  23226 -23227 -279 -23228 0
 23225  23226 -23227 -279  23229 0
 23225  23226 -23227 -279 -23230 0

c  2+1 --> break 
c    (-b^{279, 1}_2 ∧  b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧  p_279) -> break
c  in CNF:
c     b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ -p_279 ∨ break
c  in DIMACS:
 23225 -23226  23227 -279 1162 0


c  2-1 --> 1
c    (-b^{279, 1}_2 ∧  b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧ -p_279) -> (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0)
c  in CNF:
c     b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_2
c     b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_1
c     b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨  b^{279, 2}_0
c  in DIMACS:
 23225 -23226  23227  279 -23228 0
 23225 -23226  23227  279 -23229 0
 23225 -23226  23227  279  23230 0

c  1-1 --> 0
c    (-b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧  b^{279, 1}_0 ∧ -p_279) -> (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧ -b^{279, 2}_0)
c  in CNF:
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_2
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_1
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_0
c  in DIMACS:
 23225  23226 -23227  279 -23228 0
 23225  23226 -23227  279 -23229 0
 23225  23226 -23227  279 -23230 0

c  0-1 --> -1
c    (-b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧ -p_279) -> ( b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0)
c  in CNF:
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨  b^{279, 2}_2
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_1
c     b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨  b^{279, 2}_0
c  in DIMACS:
 23225  23226  23227  279  23228 0
 23225  23226  23227  279 -23229 0
 23225  23226  23227  279  23230 0

c  -1-1 --> -2
c    ( b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧  b^{279, 1}_0 ∧ -p_279) -> ( b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0)
c  in CNF:
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨  b^{279, 2}_2
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨  b^{279, 2}_1
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨  p_279 ∨ -b^{279, 2}_0
c  in DIMACS:
-23225  23226 -23227  279  23228 0
-23225  23226 -23227  279  23229 0
-23225  23226 -23227  279 -23230 0

c  -2-1 --> break 
c    ( b^{279, 1}_2 ∧  b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧ -p_279) -> break
c  in CNF:
c    -b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨  b^{279, 1}_0 ∨  p_279 ∨ break
c  in DIMACS:
-23225 -23226  23227  279 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{279, 1}_2 ∧ -b^{279, 1}_1 ∧ -b^{279, 1}_0 ∧ true) 
c  in CNF:
c    -b^{279, 1}_2 ∨  b^{279, 1}_1 ∨  b^{279, 1}_0 ∨ false 
c  in DIMACS:
-23225  23226  23227  0

c  3 does not represent an automaton state.
c    -(-b^{279, 1}_2 ∧  b^{279, 1}_1 ∧  b^{279, 1}_0 ∧ true) 
c  in CNF:
c     b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ false 
c  in DIMACS:
 23225 -23226 -23227  0
c  -3 does not represent an automaton state.
c    -( b^{279, 1}_2 ∧  b^{279, 1}_1 ∧  b^{279, 1}_0 ∧ true) 
c  in CNF:
c    -b^{279, 1}_2 ∨ -b^{279, 1}_1 ∨ -b^{279, 1}_0 ∨ false 
c  in DIMACS:
-23225 -23226 -23227  0

c i = 2
c  -2+1 --> -1
c    ( b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧  p_558) -> ( b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0)
c  in CNF:
c    -b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨  b^{279, 3}_2
c    -b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_1
c    -b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨  b^{279, 3}_0
c  in DIMACS:
-23228 -23229  23230 -558  23231 0
-23228 -23229  23230 -558 -23232 0
-23228 -23229  23230 -558  23233 0

c  -1+1 --> 0
c    ( b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0 ∧  p_558) -> (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧ -b^{279, 3}_0)
c  in CNF:
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_2
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_1
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_0
c  in DIMACS:
-23228  23229 -23230 -558 -23231 0
-23228  23229 -23230 -558 -23232 0
-23228  23229 -23230 -558 -23233 0

c  0+1 --> 1
c    (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧  p_558) -> (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0)
c  in CNF:
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_2
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_1
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨  b^{279, 3}_0
c  in DIMACS:
 23228  23229  23230 -558 -23231 0
 23228  23229  23230 -558 -23232 0
 23228  23229  23230 -558  23233 0

c  1+1 --> 2
c    (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0 ∧  p_558) -> (-b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0)
c  in CNF:
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_2
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨  b^{279, 3}_1
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ -p_558 ∨ -b^{279, 3}_0
c  in DIMACS:
 23228  23229 -23230 -558 -23231 0
 23228  23229 -23230 -558  23232 0
 23228  23229 -23230 -558 -23233 0

c  2+1 --> break 
c    (-b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧  p_558) -> break
c  in CNF:
c     b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ -p_558 ∨ break
c  in DIMACS:
 23228 -23229  23230 -558 1162 0


c  2-1 --> 1
c    (-b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧ -p_558) -> (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0)
c  in CNF:
c     b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_2
c     b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_1
c     b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨  b^{279, 3}_0
c  in DIMACS:
 23228 -23229  23230  558 -23231 0
 23228 -23229  23230  558 -23232 0
 23228 -23229  23230  558  23233 0

c  1-1 --> 0
c    (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0 ∧ -p_558) -> (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧ -b^{279, 3}_0)
c  in CNF:
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_2
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_1
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_0
c  in DIMACS:
 23228  23229 -23230  558 -23231 0
 23228  23229 -23230  558 -23232 0
 23228  23229 -23230  558 -23233 0

c  0-1 --> -1
c    (-b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧ -p_558) -> ( b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0)
c  in CNF:
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨  b^{279, 3}_2
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_1
c     b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨  b^{279, 3}_0
c  in DIMACS:
 23228  23229  23230  558  23231 0
 23228  23229  23230  558 -23232 0
 23228  23229  23230  558  23233 0

c  -1-1 --> -2
c    ( b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧  b^{279, 2}_0 ∧ -p_558) -> ( b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0)
c  in CNF:
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨  b^{279, 3}_2
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨  b^{279, 3}_1
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨  p_558 ∨ -b^{279, 3}_0
c  in DIMACS:
-23228  23229 -23230  558  23231 0
-23228  23229 -23230  558  23232 0
-23228  23229 -23230  558 -23233 0

c  -2-1 --> break 
c    ( b^{279, 2}_2 ∧  b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧ -p_558) -> break
c  in CNF:
c    -b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨  b^{279, 2}_0 ∨  p_558 ∨ break
c  in DIMACS:
-23228 -23229  23230  558 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{279, 2}_2 ∧ -b^{279, 2}_1 ∧ -b^{279, 2}_0 ∧ true) 
c  in CNF:
c    -b^{279, 2}_2 ∨  b^{279, 2}_1 ∨  b^{279, 2}_0 ∨ false 
c  in DIMACS:
-23228  23229  23230  0

c  3 does not represent an automaton state.
c    -(-b^{279, 2}_2 ∧  b^{279, 2}_1 ∧  b^{279, 2}_0 ∧ true) 
c  in CNF:
c     b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ false 
c  in DIMACS:
 23228 -23229 -23230  0
c  -3 does not represent an automaton state.
c    -( b^{279, 2}_2 ∧  b^{279, 2}_1 ∧  b^{279, 2}_0 ∧ true) 
c  in CNF:
c    -b^{279, 2}_2 ∨ -b^{279, 2}_1 ∨ -b^{279, 2}_0 ∨ false 
c  in DIMACS:
-23228 -23229 -23230  0

c i = 3
c  -2+1 --> -1
c    ( b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧  p_837) -> ( b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0)
c  in CNF:
c    -b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨  b^{279, 4}_2
c    -b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_1
c    -b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨  b^{279, 4}_0
c  in DIMACS:
-23231 -23232  23233 -837  23234 0
-23231 -23232  23233 -837 -23235 0
-23231 -23232  23233 -837  23236 0

c  -1+1 --> 0
c    ( b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0 ∧  p_837) -> (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧ -b^{279, 4}_0)
c  in CNF:
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_2
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_1
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_0
c  in DIMACS:
-23231  23232 -23233 -837 -23234 0
-23231  23232 -23233 -837 -23235 0
-23231  23232 -23233 -837 -23236 0

c  0+1 --> 1
c    (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧  p_837) -> (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0)
c  in CNF:
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_2
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_1
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨  b^{279, 4}_0
c  in DIMACS:
 23231  23232  23233 -837 -23234 0
 23231  23232  23233 -837 -23235 0
 23231  23232  23233 -837  23236 0

c  1+1 --> 2
c    (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0 ∧  p_837) -> (-b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0)
c  in CNF:
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_2
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨  b^{279, 4}_1
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ -p_837 ∨ -b^{279, 4}_0
c  in DIMACS:
 23231  23232 -23233 -837 -23234 0
 23231  23232 -23233 -837  23235 0
 23231  23232 -23233 -837 -23236 0

c  2+1 --> break 
c    (-b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧  p_837) -> break
c  in CNF:
c     b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ -p_837 ∨ break
c  in DIMACS:
 23231 -23232  23233 -837 1162 0


c  2-1 --> 1
c    (-b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧ -p_837) -> (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0)
c  in CNF:
c     b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_2
c     b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_1
c     b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨  b^{279, 4}_0
c  in DIMACS:
 23231 -23232  23233  837 -23234 0
 23231 -23232  23233  837 -23235 0
 23231 -23232  23233  837  23236 0

c  1-1 --> 0
c    (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0 ∧ -p_837) -> (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧ -b^{279, 4}_0)
c  in CNF:
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_2
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_1
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_0
c  in DIMACS:
 23231  23232 -23233  837 -23234 0
 23231  23232 -23233  837 -23235 0
 23231  23232 -23233  837 -23236 0

c  0-1 --> -1
c    (-b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧ -p_837) -> ( b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0)
c  in CNF:
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨  b^{279, 4}_2
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_1
c     b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨  b^{279, 4}_0
c  in DIMACS:
 23231  23232  23233  837  23234 0
 23231  23232  23233  837 -23235 0
 23231  23232  23233  837  23236 0

c  -1-1 --> -2
c    ( b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧  b^{279, 3}_0 ∧ -p_837) -> ( b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0)
c  in CNF:
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨  b^{279, 4}_2
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨  b^{279, 4}_1
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨  p_837 ∨ -b^{279, 4}_0
c  in DIMACS:
-23231  23232 -23233  837  23234 0
-23231  23232 -23233  837  23235 0
-23231  23232 -23233  837 -23236 0

c  -2-1 --> break 
c    ( b^{279, 3}_2 ∧  b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧ -p_837) -> break
c  in CNF:
c    -b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨  b^{279, 3}_0 ∨  p_837 ∨ break
c  in DIMACS:
-23231 -23232  23233  837 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{279, 3}_2 ∧ -b^{279, 3}_1 ∧ -b^{279, 3}_0 ∧ true) 
c  in CNF:
c    -b^{279, 3}_2 ∨  b^{279, 3}_1 ∨  b^{279, 3}_0 ∨ false 
c  in DIMACS:
-23231  23232  23233  0

c  3 does not represent an automaton state.
c    -(-b^{279, 3}_2 ∧  b^{279, 3}_1 ∧  b^{279, 3}_0 ∧ true) 
c  in CNF:
c     b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ false 
c  in DIMACS:
 23231 -23232 -23233  0
c  -3 does not represent an automaton state.
c    -( b^{279, 3}_2 ∧  b^{279, 3}_1 ∧  b^{279, 3}_0 ∧ true) 
c  in CNF:
c    -b^{279, 3}_2 ∨ -b^{279, 3}_1 ∨ -b^{279, 3}_0 ∨ false 
c  in DIMACS:
-23231 -23232 -23233  0

c i = 4
c  -2+1 --> -1
c    ( b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧  p_1116) -> ( b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧  b^{279, 5}_0)
c  in CNF:
c    -b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨  b^{279, 5}_2
c    -b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_1
c    -b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨  b^{279, 5}_0
c  in DIMACS:
-23234 -23235  23236 -1116  23237 0
-23234 -23235  23236 -1116 -23238 0
-23234 -23235  23236 -1116  23239 0

c  -1+1 --> 0
c    ( b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0 ∧  p_1116) -> (-b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧ -b^{279, 5}_0)
c  in CNF:
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_2
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_1
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_0
c  in DIMACS:
-23234  23235 -23236 -1116 -23237 0
-23234  23235 -23236 -1116 -23238 0
-23234  23235 -23236 -1116 -23239 0

c  0+1 --> 1
c    (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧  p_1116) -> (-b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧  b^{279, 5}_0)
c  in CNF:
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_2
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_1
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨  b^{279, 5}_0
c  in DIMACS:
 23234  23235  23236 -1116 -23237 0
 23234  23235  23236 -1116 -23238 0
 23234  23235  23236 -1116  23239 0

c  1+1 --> 2
c    (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0 ∧  p_1116) -> (-b^{279, 5}_2 ∧  b^{279, 5}_1 ∧ -b^{279, 5}_0)
c  in CNF:
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_2
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨  b^{279, 5}_1
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ -p_1116 ∨ -b^{279, 5}_0
c  in DIMACS:
 23234  23235 -23236 -1116 -23237 0
 23234  23235 -23236 -1116  23238 0
 23234  23235 -23236 -1116 -23239 0

c  2+1 --> break 
c    (-b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 23234 -23235  23236 -1116 1162 0


c  2-1 --> 1
c    (-b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧ -p_1116) -> (-b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧  b^{279, 5}_0)
c  in CNF:
c     b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_2
c     b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_1
c     b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨  b^{279, 5}_0
c  in DIMACS:
 23234 -23235  23236  1116 -23237 0
 23234 -23235  23236  1116 -23238 0
 23234 -23235  23236  1116  23239 0

c  1-1 --> 0
c    (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0 ∧ -p_1116) -> (-b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧ -b^{279, 5}_0)
c  in CNF:
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_2
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_1
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_0
c  in DIMACS:
 23234  23235 -23236  1116 -23237 0
 23234  23235 -23236  1116 -23238 0
 23234  23235 -23236  1116 -23239 0

c  0-1 --> -1
c    (-b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧ -p_1116) -> ( b^{279, 5}_2 ∧ -b^{279, 5}_1 ∧  b^{279, 5}_0)
c  in CNF:
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨  b^{279, 5}_2
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_1
c     b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨  b^{279, 5}_0
c  in DIMACS:
 23234  23235  23236  1116  23237 0
 23234  23235  23236  1116 -23238 0
 23234  23235  23236  1116  23239 0

c  -1-1 --> -2
c    ( b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧  b^{279, 4}_0 ∧ -p_1116) -> ( b^{279, 5}_2 ∧  b^{279, 5}_1 ∧ -b^{279, 5}_0)
c  in CNF:
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨  b^{279, 5}_2
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨  b^{279, 5}_1
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨  p_1116 ∨ -b^{279, 5}_0
c  in DIMACS:
-23234  23235 -23236  1116  23237 0
-23234  23235 -23236  1116  23238 0
-23234  23235 -23236  1116 -23239 0

c  -2-1 --> break 
c    ( b^{279, 4}_2 ∧  b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨  b^{279, 4}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-23234 -23235  23236  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{279, 4}_2 ∧ -b^{279, 4}_1 ∧ -b^{279, 4}_0 ∧ true) 
c  in CNF:
c    -b^{279, 4}_2 ∨  b^{279, 4}_1 ∨  b^{279, 4}_0 ∨ false 
c  in DIMACS:
-23234  23235  23236  0

c  3 does not represent an automaton state.
c    -(-b^{279, 4}_2 ∧  b^{279, 4}_1 ∧  b^{279, 4}_0 ∧ true) 
c  in CNF:
c     b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ false 
c  in DIMACS:
 23234 -23235 -23236  0
c  -3 does not represent an automaton state.
c    -( b^{279, 4}_2 ∧  b^{279, 4}_1 ∧  b^{279, 4}_0 ∧ true) 
c  in CNF:
c    -b^{279, 4}_2 ∨ -b^{279, 4}_1 ∨ -b^{279, 4}_0 ∨ false 
c  in DIMACS:
-23234 -23235 -23236  0

c INIT for k = 280
c    -b^{280, 1}_2
c    -b^{280, 1}_1
c    -b^{280, 1}_0
c  in DIMACS:
-23240 0
-23241 0
-23242 0

c Transitions for k = 280
c i = 1
c  -2+1 --> -1
c    ( b^{280, 1}_2 ∧  b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧  p_280) -> ( b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0)
c  in CNF:
c    -b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨  b^{280, 2}_2
c    -b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_1
c    -b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨  b^{280, 2}_0
c  in DIMACS:
-23240 -23241  23242 -280  23243 0
-23240 -23241  23242 -280 -23244 0
-23240 -23241  23242 -280  23245 0

c  -1+1 --> 0
c    ( b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧  b^{280, 1}_0 ∧  p_280) -> (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧ -b^{280, 2}_0)
c  in CNF:
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_2
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_1
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_0
c  in DIMACS:
-23240  23241 -23242 -280 -23243 0
-23240  23241 -23242 -280 -23244 0
-23240  23241 -23242 -280 -23245 0

c  0+1 --> 1
c    (-b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧  p_280) -> (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0)
c  in CNF:
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_2
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_1
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨  b^{280, 2}_0
c  in DIMACS:
 23240  23241  23242 -280 -23243 0
 23240  23241  23242 -280 -23244 0
 23240  23241  23242 -280  23245 0

c  1+1 --> 2
c    (-b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧  b^{280, 1}_0 ∧  p_280) -> (-b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0)
c  in CNF:
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_2
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨  b^{280, 2}_1
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ -p_280 ∨ -b^{280, 2}_0
c  in DIMACS:
 23240  23241 -23242 -280 -23243 0
 23240  23241 -23242 -280  23244 0
 23240  23241 -23242 -280 -23245 0

c  2+1 --> break 
c    (-b^{280, 1}_2 ∧  b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧  p_280) -> break
c  in CNF:
c     b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ -p_280 ∨ break
c  in DIMACS:
 23240 -23241  23242 -280 1162 0


c  2-1 --> 1
c    (-b^{280, 1}_2 ∧  b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧ -p_280) -> (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0)
c  in CNF:
c     b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_2
c     b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_1
c     b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨  b^{280, 2}_0
c  in DIMACS:
 23240 -23241  23242  280 -23243 0
 23240 -23241  23242  280 -23244 0
 23240 -23241  23242  280  23245 0

c  1-1 --> 0
c    (-b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧  b^{280, 1}_0 ∧ -p_280) -> (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧ -b^{280, 2}_0)
c  in CNF:
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_2
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_1
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_0
c  in DIMACS:
 23240  23241 -23242  280 -23243 0
 23240  23241 -23242  280 -23244 0
 23240  23241 -23242  280 -23245 0

c  0-1 --> -1
c    (-b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧ -p_280) -> ( b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0)
c  in CNF:
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨  b^{280, 2}_2
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_1
c     b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨  b^{280, 2}_0
c  in DIMACS:
 23240  23241  23242  280  23243 0
 23240  23241  23242  280 -23244 0
 23240  23241  23242  280  23245 0

c  -1-1 --> -2
c    ( b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧  b^{280, 1}_0 ∧ -p_280) -> ( b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0)
c  in CNF:
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨  b^{280, 2}_2
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨  b^{280, 2}_1
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨  p_280 ∨ -b^{280, 2}_0
c  in DIMACS:
-23240  23241 -23242  280  23243 0
-23240  23241 -23242  280  23244 0
-23240  23241 -23242  280 -23245 0

c  -2-1 --> break 
c    ( b^{280, 1}_2 ∧  b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧ -p_280) -> break
c  in CNF:
c    -b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨  b^{280, 1}_0 ∨  p_280 ∨ break
c  in DIMACS:
-23240 -23241  23242  280 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{280, 1}_2 ∧ -b^{280, 1}_1 ∧ -b^{280, 1}_0 ∧ true) 
c  in CNF:
c    -b^{280, 1}_2 ∨  b^{280, 1}_1 ∨  b^{280, 1}_0 ∨ false 
c  in DIMACS:
-23240  23241  23242  0

c  3 does not represent an automaton state.
c    -(-b^{280, 1}_2 ∧  b^{280, 1}_1 ∧  b^{280, 1}_0 ∧ true) 
c  in CNF:
c     b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ false 
c  in DIMACS:
 23240 -23241 -23242  0
c  -3 does not represent an automaton state.
c    -( b^{280, 1}_2 ∧  b^{280, 1}_1 ∧  b^{280, 1}_0 ∧ true) 
c  in CNF:
c    -b^{280, 1}_2 ∨ -b^{280, 1}_1 ∨ -b^{280, 1}_0 ∨ false 
c  in DIMACS:
-23240 -23241 -23242  0

c i = 2
c  -2+1 --> -1
c    ( b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧  p_560) -> ( b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0)
c  in CNF:
c    -b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨  b^{280, 3}_2
c    -b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_1
c    -b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨  b^{280, 3}_0
c  in DIMACS:
-23243 -23244  23245 -560  23246 0
-23243 -23244  23245 -560 -23247 0
-23243 -23244  23245 -560  23248 0

c  -1+1 --> 0
c    ( b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0 ∧  p_560) -> (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧ -b^{280, 3}_0)
c  in CNF:
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_2
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_1
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_0
c  in DIMACS:
-23243  23244 -23245 -560 -23246 0
-23243  23244 -23245 -560 -23247 0
-23243  23244 -23245 -560 -23248 0

c  0+1 --> 1
c    (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧  p_560) -> (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0)
c  in CNF:
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_2
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_1
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨  b^{280, 3}_0
c  in DIMACS:
 23243  23244  23245 -560 -23246 0
 23243  23244  23245 -560 -23247 0
 23243  23244  23245 -560  23248 0

c  1+1 --> 2
c    (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0 ∧  p_560) -> (-b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0)
c  in CNF:
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_2
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨  b^{280, 3}_1
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ -p_560 ∨ -b^{280, 3}_0
c  in DIMACS:
 23243  23244 -23245 -560 -23246 0
 23243  23244 -23245 -560  23247 0
 23243  23244 -23245 -560 -23248 0

c  2+1 --> break 
c    (-b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧  p_560) -> break
c  in CNF:
c     b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ -p_560 ∨ break
c  in DIMACS:
 23243 -23244  23245 -560 1162 0


c  2-1 --> 1
c    (-b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧ -p_560) -> (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0)
c  in CNF:
c     b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_2
c     b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_1
c     b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨  b^{280, 3}_0
c  in DIMACS:
 23243 -23244  23245  560 -23246 0
 23243 -23244  23245  560 -23247 0
 23243 -23244  23245  560  23248 0

c  1-1 --> 0
c    (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0 ∧ -p_560) -> (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧ -b^{280, 3}_0)
c  in CNF:
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_2
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_1
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_0
c  in DIMACS:
 23243  23244 -23245  560 -23246 0
 23243  23244 -23245  560 -23247 0
 23243  23244 -23245  560 -23248 0

c  0-1 --> -1
c    (-b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧ -p_560) -> ( b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0)
c  in CNF:
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨  b^{280, 3}_2
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_1
c     b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨  b^{280, 3}_0
c  in DIMACS:
 23243  23244  23245  560  23246 0
 23243  23244  23245  560 -23247 0
 23243  23244  23245  560  23248 0

c  -1-1 --> -2
c    ( b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧  b^{280, 2}_0 ∧ -p_560) -> ( b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0)
c  in CNF:
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨  b^{280, 3}_2
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨  b^{280, 3}_1
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨  p_560 ∨ -b^{280, 3}_0
c  in DIMACS:
-23243  23244 -23245  560  23246 0
-23243  23244 -23245  560  23247 0
-23243  23244 -23245  560 -23248 0

c  -2-1 --> break 
c    ( b^{280, 2}_2 ∧  b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧ -p_560) -> break
c  in CNF:
c    -b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨  b^{280, 2}_0 ∨  p_560 ∨ break
c  in DIMACS:
-23243 -23244  23245  560 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{280, 2}_2 ∧ -b^{280, 2}_1 ∧ -b^{280, 2}_0 ∧ true) 
c  in CNF:
c    -b^{280, 2}_2 ∨  b^{280, 2}_1 ∨  b^{280, 2}_0 ∨ false 
c  in DIMACS:
-23243  23244  23245  0

c  3 does not represent an automaton state.
c    -(-b^{280, 2}_2 ∧  b^{280, 2}_1 ∧  b^{280, 2}_0 ∧ true) 
c  in CNF:
c     b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ false 
c  in DIMACS:
 23243 -23244 -23245  0
c  -3 does not represent an automaton state.
c    -( b^{280, 2}_2 ∧  b^{280, 2}_1 ∧  b^{280, 2}_0 ∧ true) 
c  in CNF:
c    -b^{280, 2}_2 ∨ -b^{280, 2}_1 ∨ -b^{280, 2}_0 ∨ false 
c  in DIMACS:
-23243 -23244 -23245  0

c i = 3
c  -2+1 --> -1
c    ( b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧  p_840) -> ( b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0)
c  in CNF:
c    -b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨  b^{280, 4}_2
c    -b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_1
c    -b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨  b^{280, 4}_0
c  in DIMACS:
-23246 -23247  23248 -840  23249 0
-23246 -23247  23248 -840 -23250 0
-23246 -23247  23248 -840  23251 0

c  -1+1 --> 0
c    ( b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0 ∧  p_840) -> (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧ -b^{280, 4}_0)
c  in CNF:
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_2
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_1
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_0
c  in DIMACS:
-23246  23247 -23248 -840 -23249 0
-23246  23247 -23248 -840 -23250 0
-23246  23247 -23248 -840 -23251 0

c  0+1 --> 1
c    (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧  p_840) -> (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0)
c  in CNF:
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_2
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_1
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨  b^{280, 4}_0
c  in DIMACS:
 23246  23247  23248 -840 -23249 0
 23246  23247  23248 -840 -23250 0
 23246  23247  23248 -840  23251 0

c  1+1 --> 2
c    (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0 ∧  p_840) -> (-b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0)
c  in CNF:
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_2
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨  b^{280, 4}_1
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ -p_840 ∨ -b^{280, 4}_0
c  in DIMACS:
 23246  23247 -23248 -840 -23249 0
 23246  23247 -23248 -840  23250 0
 23246  23247 -23248 -840 -23251 0

c  2+1 --> break 
c    (-b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧  p_840) -> break
c  in CNF:
c     b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ -p_840 ∨ break
c  in DIMACS:
 23246 -23247  23248 -840 1162 0


c  2-1 --> 1
c    (-b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧ -p_840) -> (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0)
c  in CNF:
c     b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_2
c     b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_1
c     b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨  b^{280, 4}_0
c  in DIMACS:
 23246 -23247  23248  840 -23249 0
 23246 -23247  23248  840 -23250 0
 23246 -23247  23248  840  23251 0

c  1-1 --> 0
c    (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0 ∧ -p_840) -> (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧ -b^{280, 4}_0)
c  in CNF:
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_2
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_1
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_0
c  in DIMACS:
 23246  23247 -23248  840 -23249 0
 23246  23247 -23248  840 -23250 0
 23246  23247 -23248  840 -23251 0

c  0-1 --> -1
c    (-b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧ -p_840) -> ( b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0)
c  in CNF:
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨  b^{280, 4}_2
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_1
c     b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨  b^{280, 4}_0
c  in DIMACS:
 23246  23247  23248  840  23249 0
 23246  23247  23248  840 -23250 0
 23246  23247  23248  840  23251 0

c  -1-1 --> -2
c    ( b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧  b^{280, 3}_0 ∧ -p_840) -> ( b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0)
c  in CNF:
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨  b^{280, 4}_2
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨  b^{280, 4}_1
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨  p_840 ∨ -b^{280, 4}_0
c  in DIMACS:
-23246  23247 -23248  840  23249 0
-23246  23247 -23248  840  23250 0
-23246  23247 -23248  840 -23251 0

c  -2-1 --> break 
c    ( b^{280, 3}_2 ∧  b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧ -p_840) -> break
c  in CNF:
c    -b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨  b^{280, 3}_0 ∨  p_840 ∨ break
c  in DIMACS:
-23246 -23247  23248  840 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{280, 3}_2 ∧ -b^{280, 3}_1 ∧ -b^{280, 3}_0 ∧ true) 
c  in CNF:
c    -b^{280, 3}_2 ∨  b^{280, 3}_1 ∨  b^{280, 3}_0 ∨ false 
c  in DIMACS:
-23246  23247  23248  0

c  3 does not represent an automaton state.
c    -(-b^{280, 3}_2 ∧  b^{280, 3}_1 ∧  b^{280, 3}_0 ∧ true) 
c  in CNF:
c     b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ false 
c  in DIMACS:
 23246 -23247 -23248  0
c  -3 does not represent an automaton state.
c    -( b^{280, 3}_2 ∧  b^{280, 3}_1 ∧  b^{280, 3}_0 ∧ true) 
c  in CNF:
c    -b^{280, 3}_2 ∨ -b^{280, 3}_1 ∨ -b^{280, 3}_0 ∨ false 
c  in DIMACS:
-23246 -23247 -23248  0

c i = 4
c  -2+1 --> -1
c    ( b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧  p_1120) -> ( b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧  b^{280, 5}_0)
c  in CNF:
c    -b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨  b^{280, 5}_2
c    -b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_1
c    -b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨  b^{280, 5}_0
c  in DIMACS:
-23249 -23250  23251 -1120  23252 0
-23249 -23250  23251 -1120 -23253 0
-23249 -23250  23251 -1120  23254 0

c  -1+1 --> 0
c    ( b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0 ∧  p_1120) -> (-b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧ -b^{280, 5}_0)
c  in CNF:
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_2
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_1
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_0
c  in DIMACS:
-23249  23250 -23251 -1120 -23252 0
-23249  23250 -23251 -1120 -23253 0
-23249  23250 -23251 -1120 -23254 0

c  0+1 --> 1
c    (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧  p_1120) -> (-b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧  b^{280, 5}_0)
c  in CNF:
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_2
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_1
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨  b^{280, 5}_0
c  in DIMACS:
 23249  23250  23251 -1120 -23252 0
 23249  23250  23251 -1120 -23253 0
 23249  23250  23251 -1120  23254 0

c  1+1 --> 2
c    (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0 ∧  p_1120) -> (-b^{280, 5}_2 ∧  b^{280, 5}_1 ∧ -b^{280, 5}_0)
c  in CNF:
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_2
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨  b^{280, 5}_1
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ -p_1120 ∨ -b^{280, 5}_0
c  in DIMACS:
 23249  23250 -23251 -1120 -23252 0
 23249  23250 -23251 -1120  23253 0
 23249  23250 -23251 -1120 -23254 0

c  2+1 --> break 
c    (-b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧  p_1120) -> break
c  in CNF:
c     b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ -p_1120 ∨ break
c  in DIMACS:
 23249 -23250  23251 -1120 1162 0


c  2-1 --> 1
c    (-b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧ -p_1120) -> (-b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧  b^{280, 5}_0)
c  in CNF:
c     b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_2
c     b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_1
c     b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨  b^{280, 5}_0
c  in DIMACS:
 23249 -23250  23251  1120 -23252 0
 23249 -23250  23251  1120 -23253 0
 23249 -23250  23251  1120  23254 0

c  1-1 --> 0
c    (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0 ∧ -p_1120) -> (-b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧ -b^{280, 5}_0)
c  in CNF:
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_2
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_1
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_0
c  in DIMACS:
 23249  23250 -23251  1120 -23252 0
 23249  23250 -23251  1120 -23253 0
 23249  23250 -23251  1120 -23254 0

c  0-1 --> -1
c    (-b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧ -p_1120) -> ( b^{280, 5}_2 ∧ -b^{280, 5}_1 ∧  b^{280, 5}_0)
c  in CNF:
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨  b^{280, 5}_2
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_1
c     b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨  b^{280, 5}_0
c  in DIMACS:
 23249  23250  23251  1120  23252 0
 23249  23250  23251  1120 -23253 0
 23249  23250  23251  1120  23254 0

c  -1-1 --> -2
c    ( b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧  b^{280, 4}_0 ∧ -p_1120) -> ( b^{280, 5}_2 ∧  b^{280, 5}_1 ∧ -b^{280, 5}_0)
c  in CNF:
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨  b^{280, 5}_2
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨  b^{280, 5}_1
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨  p_1120 ∨ -b^{280, 5}_0
c  in DIMACS:
-23249  23250 -23251  1120  23252 0
-23249  23250 -23251  1120  23253 0
-23249  23250 -23251  1120 -23254 0

c  -2-1 --> break 
c    ( b^{280, 4}_2 ∧  b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧ -p_1120) -> break
c  in CNF:
c    -b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨  b^{280, 4}_0 ∨  p_1120 ∨ break
c  in DIMACS:
-23249 -23250  23251  1120 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{280, 4}_2 ∧ -b^{280, 4}_1 ∧ -b^{280, 4}_0 ∧ true) 
c  in CNF:
c    -b^{280, 4}_2 ∨  b^{280, 4}_1 ∨  b^{280, 4}_0 ∨ false 
c  in DIMACS:
-23249  23250  23251  0

c  3 does not represent an automaton state.
c    -(-b^{280, 4}_2 ∧  b^{280, 4}_1 ∧  b^{280, 4}_0 ∧ true) 
c  in CNF:
c     b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ false 
c  in DIMACS:
 23249 -23250 -23251  0
c  -3 does not represent an automaton state.
c    -( b^{280, 4}_2 ∧  b^{280, 4}_1 ∧  b^{280, 4}_0 ∧ true) 
c  in CNF:
c    -b^{280, 4}_2 ∨ -b^{280, 4}_1 ∨ -b^{280, 4}_0 ∨ false 
c  in DIMACS:
-23249 -23250 -23251  0

c INIT for k = 281
c    -b^{281, 1}_2
c    -b^{281, 1}_1
c    -b^{281, 1}_0
c  in DIMACS:
-23255 0
-23256 0
-23257 0

c Transitions for k = 281
c i = 1
c  -2+1 --> -1
c    ( b^{281, 1}_2 ∧  b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧  p_281) -> ( b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0)
c  in CNF:
c    -b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨  b^{281, 2}_2
c    -b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_1
c    -b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨  b^{281, 2}_0
c  in DIMACS:
-23255 -23256  23257 -281  23258 0
-23255 -23256  23257 -281 -23259 0
-23255 -23256  23257 -281  23260 0

c  -1+1 --> 0
c    ( b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧  b^{281, 1}_0 ∧  p_281) -> (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧ -b^{281, 2}_0)
c  in CNF:
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_2
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_1
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_0
c  in DIMACS:
-23255  23256 -23257 -281 -23258 0
-23255  23256 -23257 -281 -23259 0
-23255  23256 -23257 -281 -23260 0

c  0+1 --> 1
c    (-b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧  p_281) -> (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0)
c  in CNF:
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_2
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_1
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨  b^{281, 2}_0
c  in DIMACS:
 23255  23256  23257 -281 -23258 0
 23255  23256  23257 -281 -23259 0
 23255  23256  23257 -281  23260 0

c  1+1 --> 2
c    (-b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧  b^{281, 1}_0 ∧  p_281) -> (-b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0)
c  in CNF:
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_2
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨  b^{281, 2}_1
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ -p_281 ∨ -b^{281, 2}_0
c  in DIMACS:
 23255  23256 -23257 -281 -23258 0
 23255  23256 -23257 -281  23259 0
 23255  23256 -23257 -281 -23260 0

c  2+1 --> break 
c    (-b^{281, 1}_2 ∧  b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧  p_281) -> break
c  in CNF:
c     b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ -p_281 ∨ break
c  in DIMACS:
 23255 -23256  23257 -281 1162 0


c  2-1 --> 1
c    (-b^{281, 1}_2 ∧  b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧ -p_281) -> (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0)
c  in CNF:
c     b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_2
c     b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_1
c     b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨  b^{281, 2}_0
c  in DIMACS:
 23255 -23256  23257  281 -23258 0
 23255 -23256  23257  281 -23259 0
 23255 -23256  23257  281  23260 0

c  1-1 --> 0
c    (-b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧  b^{281, 1}_0 ∧ -p_281) -> (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧ -b^{281, 2}_0)
c  in CNF:
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_2
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_1
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_0
c  in DIMACS:
 23255  23256 -23257  281 -23258 0
 23255  23256 -23257  281 -23259 0
 23255  23256 -23257  281 -23260 0

c  0-1 --> -1
c    (-b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧ -p_281) -> ( b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0)
c  in CNF:
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨  b^{281, 2}_2
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_1
c     b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨  b^{281, 2}_0
c  in DIMACS:
 23255  23256  23257  281  23258 0
 23255  23256  23257  281 -23259 0
 23255  23256  23257  281  23260 0

c  -1-1 --> -2
c    ( b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧  b^{281, 1}_0 ∧ -p_281) -> ( b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0)
c  in CNF:
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨  b^{281, 2}_2
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨  b^{281, 2}_1
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨  p_281 ∨ -b^{281, 2}_0
c  in DIMACS:
-23255  23256 -23257  281  23258 0
-23255  23256 -23257  281  23259 0
-23255  23256 -23257  281 -23260 0

c  -2-1 --> break 
c    ( b^{281, 1}_2 ∧  b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧ -p_281) -> break
c  in CNF:
c    -b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨  b^{281, 1}_0 ∨  p_281 ∨ break
c  in DIMACS:
-23255 -23256  23257  281 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{281, 1}_2 ∧ -b^{281, 1}_1 ∧ -b^{281, 1}_0 ∧ true) 
c  in CNF:
c    -b^{281, 1}_2 ∨  b^{281, 1}_1 ∨  b^{281, 1}_0 ∨ false 
c  in DIMACS:
-23255  23256  23257  0

c  3 does not represent an automaton state.
c    -(-b^{281, 1}_2 ∧  b^{281, 1}_1 ∧  b^{281, 1}_0 ∧ true) 
c  in CNF:
c     b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ false 
c  in DIMACS:
 23255 -23256 -23257  0
c  -3 does not represent an automaton state.
c    -( b^{281, 1}_2 ∧  b^{281, 1}_1 ∧  b^{281, 1}_0 ∧ true) 
c  in CNF:
c    -b^{281, 1}_2 ∨ -b^{281, 1}_1 ∨ -b^{281, 1}_0 ∨ false 
c  in DIMACS:
-23255 -23256 -23257  0

c i = 2
c  -2+1 --> -1
c    ( b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧  p_562) -> ( b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0)
c  in CNF:
c    -b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨  b^{281, 3}_2
c    -b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_1
c    -b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨  b^{281, 3}_0
c  in DIMACS:
-23258 -23259  23260 -562  23261 0
-23258 -23259  23260 -562 -23262 0
-23258 -23259  23260 -562  23263 0

c  -1+1 --> 0
c    ( b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0 ∧  p_562) -> (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧ -b^{281, 3}_0)
c  in CNF:
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_2
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_1
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_0
c  in DIMACS:
-23258  23259 -23260 -562 -23261 0
-23258  23259 -23260 -562 -23262 0
-23258  23259 -23260 -562 -23263 0

c  0+1 --> 1
c    (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧  p_562) -> (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0)
c  in CNF:
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_2
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_1
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨  b^{281, 3}_0
c  in DIMACS:
 23258  23259  23260 -562 -23261 0
 23258  23259  23260 -562 -23262 0
 23258  23259  23260 -562  23263 0

c  1+1 --> 2
c    (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0 ∧  p_562) -> (-b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0)
c  in CNF:
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_2
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨  b^{281, 3}_1
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ -p_562 ∨ -b^{281, 3}_0
c  in DIMACS:
 23258  23259 -23260 -562 -23261 0
 23258  23259 -23260 -562  23262 0
 23258  23259 -23260 -562 -23263 0

c  2+1 --> break 
c    (-b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧  p_562) -> break
c  in CNF:
c     b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ -p_562 ∨ break
c  in DIMACS:
 23258 -23259  23260 -562 1162 0


c  2-1 --> 1
c    (-b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧ -p_562) -> (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0)
c  in CNF:
c     b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_2
c     b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_1
c     b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨  b^{281, 3}_0
c  in DIMACS:
 23258 -23259  23260  562 -23261 0
 23258 -23259  23260  562 -23262 0
 23258 -23259  23260  562  23263 0

c  1-1 --> 0
c    (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0 ∧ -p_562) -> (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧ -b^{281, 3}_0)
c  in CNF:
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_2
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_1
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_0
c  in DIMACS:
 23258  23259 -23260  562 -23261 0
 23258  23259 -23260  562 -23262 0
 23258  23259 -23260  562 -23263 0

c  0-1 --> -1
c    (-b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧ -p_562) -> ( b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0)
c  in CNF:
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨  b^{281, 3}_2
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_1
c     b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨  b^{281, 3}_0
c  in DIMACS:
 23258  23259  23260  562  23261 0
 23258  23259  23260  562 -23262 0
 23258  23259  23260  562  23263 0

c  -1-1 --> -2
c    ( b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧  b^{281, 2}_0 ∧ -p_562) -> ( b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0)
c  in CNF:
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨  b^{281, 3}_2
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨  b^{281, 3}_1
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨  p_562 ∨ -b^{281, 3}_0
c  in DIMACS:
-23258  23259 -23260  562  23261 0
-23258  23259 -23260  562  23262 0
-23258  23259 -23260  562 -23263 0

c  -2-1 --> break 
c    ( b^{281, 2}_2 ∧  b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧ -p_562) -> break
c  in CNF:
c    -b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨  b^{281, 2}_0 ∨  p_562 ∨ break
c  in DIMACS:
-23258 -23259  23260  562 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{281, 2}_2 ∧ -b^{281, 2}_1 ∧ -b^{281, 2}_0 ∧ true) 
c  in CNF:
c    -b^{281, 2}_2 ∨  b^{281, 2}_1 ∨  b^{281, 2}_0 ∨ false 
c  in DIMACS:
-23258  23259  23260  0

c  3 does not represent an automaton state.
c    -(-b^{281, 2}_2 ∧  b^{281, 2}_1 ∧  b^{281, 2}_0 ∧ true) 
c  in CNF:
c     b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ false 
c  in DIMACS:
 23258 -23259 -23260  0
c  -3 does not represent an automaton state.
c    -( b^{281, 2}_2 ∧  b^{281, 2}_1 ∧  b^{281, 2}_0 ∧ true) 
c  in CNF:
c    -b^{281, 2}_2 ∨ -b^{281, 2}_1 ∨ -b^{281, 2}_0 ∨ false 
c  in DIMACS:
-23258 -23259 -23260  0

c i = 3
c  -2+1 --> -1
c    ( b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧  p_843) -> ( b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0)
c  in CNF:
c    -b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨  b^{281, 4}_2
c    -b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_1
c    -b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨  b^{281, 4}_0
c  in DIMACS:
-23261 -23262  23263 -843  23264 0
-23261 -23262  23263 -843 -23265 0
-23261 -23262  23263 -843  23266 0

c  -1+1 --> 0
c    ( b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0 ∧  p_843) -> (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧ -b^{281, 4}_0)
c  in CNF:
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_2
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_1
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_0
c  in DIMACS:
-23261  23262 -23263 -843 -23264 0
-23261  23262 -23263 -843 -23265 0
-23261  23262 -23263 -843 -23266 0

c  0+1 --> 1
c    (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧  p_843) -> (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0)
c  in CNF:
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_2
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_1
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨  b^{281, 4}_0
c  in DIMACS:
 23261  23262  23263 -843 -23264 0
 23261  23262  23263 -843 -23265 0
 23261  23262  23263 -843  23266 0

c  1+1 --> 2
c    (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0 ∧  p_843) -> (-b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0)
c  in CNF:
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_2
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨  b^{281, 4}_1
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ -p_843 ∨ -b^{281, 4}_0
c  in DIMACS:
 23261  23262 -23263 -843 -23264 0
 23261  23262 -23263 -843  23265 0
 23261  23262 -23263 -843 -23266 0

c  2+1 --> break 
c    (-b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧  p_843) -> break
c  in CNF:
c     b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ -p_843 ∨ break
c  in DIMACS:
 23261 -23262  23263 -843 1162 0


c  2-1 --> 1
c    (-b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧ -p_843) -> (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0)
c  in CNF:
c     b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_2
c     b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_1
c     b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨  b^{281, 4}_0
c  in DIMACS:
 23261 -23262  23263  843 -23264 0
 23261 -23262  23263  843 -23265 0
 23261 -23262  23263  843  23266 0

c  1-1 --> 0
c    (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0 ∧ -p_843) -> (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧ -b^{281, 4}_0)
c  in CNF:
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_2
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_1
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_0
c  in DIMACS:
 23261  23262 -23263  843 -23264 0
 23261  23262 -23263  843 -23265 0
 23261  23262 -23263  843 -23266 0

c  0-1 --> -1
c    (-b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧ -p_843) -> ( b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0)
c  in CNF:
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨  b^{281, 4}_2
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_1
c     b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨  b^{281, 4}_0
c  in DIMACS:
 23261  23262  23263  843  23264 0
 23261  23262  23263  843 -23265 0
 23261  23262  23263  843  23266 0

c  -1-1 --> -2
c    ( b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧  b^{281, 3}_0 ∧ -p_843) -> ( b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0)
c  in CNF:
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨  b^{281, 4}_2
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨  b^{281, 4}_1
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨  p_843 ∨ -b^{281, 4}_0
c  in DIMACS:
-23261  23262 -23263  843  23264 0
-23261  23262 -23263  843  23265 0
-23261  23262 -23263  843 -23266 0

c  -2-1 --> break 
c    ( b^{281, 3}_2 ∧  b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧ -p_843) -> break
c  in CNF:
c    -b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨  b^{281, 3}_0 ∨  p_843 ∨ break
c  in DIMACS:
-23261 -23262  23263  843 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{281, 3}_2 ∧ -b^{281, 3}_1 ∧ -b^{281, 3}_0 ∧ true) 
c  in CNF:
c    -b^{281, 3}_2 ∨  b^{281, 3}_1 ∨  b^{281, 3}_0 ∨ false 
c  in DIMACS:
-23261  23262  23263  0

c  3 does not represent an automaton state.
c    -(-b^{281, 3}_2 ∧  b^{281, 3}_1 ∧  b^{281, 3}_0 ∧ true) 
c  in CNF:
c     b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ false 
c  in DIMACS:
 23261 -23262 -23263  0
c  -3 does not represent an automaton state.
c    -( b^{281, 3}_2 ∧  b^{281, 3}_1 ∧  b^{281, 3}_0 ∧ true) 
c  in CNF:
c    -b^{281, 3}_2 ∨ -b^{281, 3}_1 ∨ -b^{281, 3}_0 ∨ false 
c  in DIMACS:
-23261 -23262 -23263  0

c i = 4
c  -2+1 --> -1
c    ( b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧  p_1124) -> ( b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧  b^{281, 5}_0)
c  in CNF:
c    -b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨  b^{281, 5}_2
c    -b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_1
c    -b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨  b^{281, 5}_0
c  in DIMACS:
-23264 -23265  23266 -1124  23267 0
-23264 -23265  23266 -1124 -23268 0
-23264 -23265  23266 -1124  23269 0

c  -1+1 --> 0
c    ( b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0 ∧  p_1124) -> (-b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧ -b^{281, 5}_0)
c  in CNF:
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_2
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_1
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_0
c  in DIMACS:
-23264  23265 -23266 -1124 -23267 0
-23264  23265 -23266 -1124 -23268 0
-23264  23265 -23266 -1124 -23269 0

c  0+1 --> 1
c    (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧  p_1124) -> (-b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧  b^{281, 5}_0)
c  in CNF:
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_2
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_1
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨  b^{281, 5}_0
c  in DIMACS:
 23264  23265  23266 -1124 -23267 0
 23264  23265  23266 -1124 -23268 0
 23264  23265  23266 -1124  23269 0

c  1+1 --> 2
c    (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0 ∧  p_1124) -> (-b^{281, 5}_2 ∧  b^{281, 5}_1 ∧ -b^{281, 5}_0)
c  in CNF:
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_2
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨  b^{281, 5}_1
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ -p_1124 ∨ -b^{281, 5}_0
c  in DIMACS:
 23264  23265 -23266 -1124 -23267 0
 23264  23265 -23266 -1124  23268 0
 23264  23265 -23266 -1124 -23269 0

c  2+1 --> break 
c    (-b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧  p_1124) -> break
c  in CNF:
c     b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ -p_1124 ∨ break
c  in DIMACS:
 23264 -23265  23266 -1124 1162 0


c  2-1 --> 1
c    (-b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧ -p_1124) -> (-b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧  b^{281, 5}_0)
c  in CNF:
c     b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_2
c     b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_1
c     b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨  b^{281, 5}_0
c  in DIMACS:
 23264 -23265  23266  1124 -23267 0
 23264 -23265  23266  1124 -23268 0
 23264 -23265  23266  1124  23269 0

c  1-1 --> 0
c    (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0 ∧ -p_1124) -> (-b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧ -b^{281, 5}_0)
c  in CNF:
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_2
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_1
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_0
c  in DIMACS:
 23264  23265 -23266  1124 -23267 0
 23264  23265 -23266  1124 -23268 0
 23264  23265 -23266  1124 -23269 0

c  0-1 --> -1
c    (-b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧ -p_1124) -> ( b^{281, 5}_2 ∧ -b^{281, 5}_1 ∧  b^{281, 5}_0)
c  in CNF:
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨  b^{281, 5}_2
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_1
c     b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨  b^{281, 5}_0
c  in DIMACS:
 23264  23265  23266  1124  23267 0
 23264  23265  23266  1124 -23268 0
 23264  23265  23266  1124  23269 0

c  -1-1 --> -2
c    ( b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧  b^{281, 4}_0 ∧ -p_1124) -> ( b^{281, 5}_2 ∧  b^{281, 5}_1 ∧ -b^{281, 5}_0)
c  in CNF:
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨  b^{281, 5}_2
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨  b^{281, 5}_1
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨  p_1124 ∨ -b^{281, 5}_0
c  in DIMACS:
-23264  23265 -23266  1124  23267 0
-23264  23265 -23266  1124  23268 0
-23264  23265 -23266  1124 -23269 0

c  -2-1 --> break 
c    ( b^{281, 4}_2 ∧  b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧ -p_1124) -> break
c  in CNF:
c    -b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨  b^{281, 4}_0 ∨  p_1124 ∨ break
c  in DIMACS:
-23264 -23265  23266  1124 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{281, 4}_2 ∧ -b^{281, 4}_1 ∧ -b^{281, 4}_0 ∧ true) 
c  in CNF:
c    -b^{281, 4}_2 ∨  b^{281, 4}_1 ∨  b^{281, 4}_0 ∨ false 
c  in DIMACS:
-23264  23265  23266  0

c  3 does not represent an automaton state.
c    -(-b^{281, 4}_2 ∧  b^{281, 4}_1 ∧  b^{281, 4}_0 ∧ true) 
c  in CNF:
c     b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ false 
c  in DIMACS:
 23264 -23265 -23266  0
c  -3 does not represent an automaton state.
c    -( b^{281, 4}_2 ∧  b^{281, 4}_1 ∧  b^{281, 4}_0 ∧ true) 
c  in CNF:
c    -b^{281, 4}_2 ∨ -b^{281, 4}_1 ∨ -b^{281, 4}_0 ∨ false 
c  in DIMACS:
-23264 -23265 -23266  0

c INIT for k = 282
c    -b^{282, 1}_2
c    -b^{282, 1}_1
c    -b^{282, 1}_0
c  in DIMACS:
-23270 0
-23271 0
-23272 0

c Transitions for k = 282
c i = 1
c  -2+1 --> -1
c    ( b^{282, 1}_2 ∧  b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧  p_282) -> ( b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0)
c  in CNF:
c    -b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨  b^{282, 2}_2
c    -b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_1
c    -b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨  b^{282, 2}_0
c  in DIMACS:
-23270 -23271  23272 -282  23273 0
-23270 -23271  23272 -282 -23274 0
-23270 -23271  23272 -282  23275 0

c  -1+1 --> 0
c    ( b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧  b^{282, 1}_0 ∧  p_282) -> (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧ -b^{282, 2}_0)
c  in CNF:
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_2
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_1
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_0
c  in DIMACS:
-23270  23271 -23272 -282 -23273 0
-23270  23271 -23272 -282 -23274 0
-23270  23271 -23272 -282 -23275 0

c  0+1 --> 1
c    (-b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧  p_282) -> (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0)
c  in CNF:
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_2
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_1
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨  b^{282, 2}_0
c  in DIMACS:
 23270  23271  23272 -282 -23273 0
 23270  23271  23272 -282 -23274 0
 23270  23271  23272 -282  23275 0

c  1+1 --> 2
c    (-b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧  b^{282, 1}_0 ∧  p_282) -> (-b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0)
c  in CNF:
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_2
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨  b^{282, 2}_1
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ -p_282 ∨ -b^{282, 2}_0
c  in DIMACS:
 23270  23271 -23272 -282 -23273 0
 23270  23271 -23272 -282  23274 0
 23270  23271 -23272 -282 -23275 0

c  2+1 --> break 
c    (-b^{282, 1}_2 ∧  b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧  p_282) -> break
c  in CNF:
c     b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ -p_282 ∨ break
c  in DIMACS:
 23270 -23271  23272 -282 1162 0


c  2-1 --> 1
c    (-b^{282, 1}_2 ∧  b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧ -p_282) -> (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0)
c  in CNF:
c     b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_2
c     b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_1
c     b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨  b^{282, 2}_0
c  in DIMACS:
 23270 -23271  23272  282 -23273 0
 23270 -23271  23272  282 -23274 0
 23270 -23271  23272  282  23275 0

c  1-1 --> 0
c    (-b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧  b^{282, 1}_0 ∧ -p_282) -> (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧ -b^{282, 2}_0)
c  in CNF:
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_2
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_1
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_0
c  in DIMACS:
 23270  23271 -23272  282 -23273 0
 23270  23271 -23272  282 -23274 0
 23270  23271 -23272  282 -23275 0

c  0-1 --> -1
c    (-b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧ -p_282) -> ( b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0)
c  in CNF:
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨  b^{282, 2}_2
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_1
c     b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨  b^{282, 2}_0
c  in DIMACS:
 23270  23271  23272  282  23273 0
 23270  23271  23272  282 -23274 0
 23270  23271  23272  282  23275 0

c  -1-1 --> -2
c    ( b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧  b^{282, 1}_0 ∧ -p_282) -> ( b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0)
c  in CNF:
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨  b^{282, 2}_2
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨  b^{282, 2}_1
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨  p_282 ∨ -b^{282, 2}_0
c  in DIMACS:
-23270  23271 -23272  282  23273 0
-23270  23271 -23272  282  23274 0
-23270  23271 -23272  282 -23275 0

c  -2-1 --> break 
c    ( b^{282, 1}_2 ∧  b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧ -p_282) -> break
c  in CNF:
c    -b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨  b^{282, 1}_0 ∨  p_282 ∨ break
c  in DIMACS:
-23270 -23271  23272  282 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{282, 1}_2 ∧ -b^{282, 1}_1 ∧ -b^{282, 1}_0 ∧ true) 
c  in CNF:
c    -b^{282, 1}_2 ∨  b^{282, 1}_1 ∨  b^{282, 1}_0 ∨ false 
c  in DIMACS:
-23270  23271  23272  0

c  3 does not represent an automaton state.
c    -(-b^{282, 1}_2 ∧  b^{282, 1}_1 ∧  b^{282, 1}_0 ∧ true) 
c  in CNF:
c     b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ false 
c  in DIMACS:
 23270 -23271 -23272  0
c  -3 does not represent an automaton state.
c    -( b^{282, 1}_2 ∧  b^{282, 1}_1 ∧  b^{282, 1}_0 ∧ true) 
c  in CNF:
c    -b^{282, 1}_2 ∨ -b^{282, 1}_1 ∨ -b^{282, 1}_0 ∨ false 
c  in DIMACS:
-23270 -23271 -23272  0

c i = 2
c  -2+1 --> -1
c    ( b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧  p_564) -> ( b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0)
c  in CNF:
c    -b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨  b^{282, 3}_2
c    -b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_1
c    -b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨  b^{282, 3}_0
c  in DIMACS:
-23273 -23274  23275 -564  23276 0
-23273 -23274  23275 -564 -23277 0
-23273 -23274  23275 -564  23278 0

c  -1+1 --> 0
c    ( b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0 ∧  p_564) -> (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧ -b^{282, 3}_0)
c  in CNF:
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_2
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_1
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_0
c  in DIMACS:
-23273  23274 -23275 -564 -23276 0
-23273  23274 -23275 -564 -23277 0
-23273  23274 -23275 -564 -23278 0

c  0+1 --> 1
c    (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧  p_564) -> (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0)
c  in CNF:
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_2
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_1
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨  b^{282, 3}_0
c  in DIMACS:
 23273  23274  23275 -564 -23276 0
 23273  23274  23275 -564 -23277 0
 23273  23274  23275 -564  23278 0

c  1+1 --> 2
c    (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0 ∧  p_564) -> (-b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0)
c  in CNF:
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_2
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨  b^{282, 3}_1
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ -p_564 ∨ -b^{282, 3}_0
c  in DIMACS:
 23273  23274 -23275 -564 -23276 0
 23273  23274 -23275 -564  23277 0
 23273  23274 -23275 -564 -23278 0

c  2+1 --> break 
c    (-b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧  p_564) -> break
c  in CNF:
c     b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ -p_564 ∨ break
c  in DIMACS:
 23273 -23274  23275 -564 1162 0


c  2-1 --> 1
c    (-b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧ -p_564) -> (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0)
c  in CNF:
c     b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_2
c     b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_1
c     b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨  b^{282, 3}_0
c  in DIMACS:
 23273 -23274  23275  564 -23276 0
 23273 -23274  23275  564 -23277 0
 23273 -23274  23275  564  23278 0

c  1-1 --> 0
c    (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0 ∧ -p_564) -> (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧ -b^{282, 3}_0)
c  in CNF:
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_2
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_1
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_0
c  in DIMACS:
 23273  23274 -23275  564 -23276 0
 23273  23274 -23275  564 -23277 0
 23273  23274 -23275  564 -23278 0

c  0-1 --> -1
c    (-b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧ -p_564) -> ( b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0)
c  in CNF:
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨  b^{282, 3}_2
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_1
c     b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨  b^{282, 3}_0
c  in DIMACS:
 23273  23274  23275  564  23276 0
 23273  23274  23275  564 -23277 0
 23273  23274  23275  564  23278 0

c  -1-1 --> -2
c    ( b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧  b^{282, 2}_0 ∧ -p_564) -> ( b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0)
c  in CNF:
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨  b^{282, 3}_2
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨  b^{282, 3}_1
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨  p_564 ∨ -b^{282, 3}_0
c  in DIMACS:
-23273  23274 -23275  564  23276 0
-23273  23274 -23275  564  23277 0
-23273  23274 -23275  564 -23278 0

c  -2-1 --> break 
c    ( b^{282, 2}_2 ∧  b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧ -p_564) -> break
c  in CNF:
c    -b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨  b^{282, 2}_0 ∨  p_564 ∨ break
c  in DIMACS:
-23273 -23274  23275  564 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{282, 2}_2 ∧ -b^{282, 2}_1 ∧ -b^{282, 2}_0 ∧ true) 
c  in CNF:
c    -b^{282, 2}_2 ∨  b^{282, 2}_1 ∨  b^{282, 2}_0 ∨ false 
c  in DIMACS:
-23273  23274  23275  0

c  3 does not represent an automaton state.
c    -(-b^{282, 2}_2 ∧  b^{282, 2}_1 ∧  b^{282, 2}_0 ∧ true) 
c  in CNF:
c     b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ false 
c  in DIMACS:
 23273 -23274 -23275  0
c  -3 does not represent an automaton state.
c    -( b^{282, 2}_2 ∧  b^{282, 2}_1 ∧  b^{282, 2}_0 ∧ true) 
c  in CNF:
c    -b^{282, 2}_2 ∨ -b^{282, 2}_1 ∨ -b^{282, 2}_0 ∨ false 
c  in DIMACS:
-23273 -23274 -23275  0

c i = 3
c  -2+1 --> -1
c    ( b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧  p_846) -> ( b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0)
c  in CNF:
c    -b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨  b^{282, 4}_2
c    -b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_1
c    -b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨  b^{282, 4}_0
c  in DIMACS:
-23276 -23277  23278 -846  23279 0
-23276 -23277  23278 -846 -23280 0
-23276 -23277  23278 -846  23281 0

c  -1+1 --> 0
c    ( b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0 ∧  p_846) -> (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧ -b^{282, 4}_0)
c  in CNF:
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_2
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_1
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_0
c  in DIMACS:
-23276  23277 -23278 -846 -23279 0
-23276  23277 -23278 -846 -23280 0
-23276  23277 -23278 -846 -23281 0

c  0+1 --> 1
c    (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧  p_846) -> (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0)
c  in CNF:
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_2
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_1
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨  b^{282, 4}_0
c  in DIMACS:
 23276  23277  23278 -846 -23279 0
 23276  23277  23278 -846 -23280 0
 23276  23277  23278 -846  23281 0

c  1+1 --> 2
c    (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0 ∧  p_846) -> (-b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0)
c  in CNF:
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_2
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨  b^{282, 4}_1
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ -p_846 ∨ -b^{282, 4}_0
c  in DIMACS:
 23276  23277 -23278 -846 -23279 0
 23276  23277 -23278 -846  23280 0
 23276  23277 -23278 -846 -23281 0

c  2+1 --> break 
c    (-b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧  p_846) -> break
c  in CNF:
c     b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ -p_846 ∨ break
c  in DIMACS:
 23276 -23277  23278 -846 1162 0


c  2-1 --> 1
c    (-b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧ -p_846) -> (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0)
c  in CNF:
c     b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_2
c     b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_1
c     b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨  b^{282, 4}_0
c  in DIMACS:
 23276 -23277  23278  846 -23279 0
 23276 -23277  23278  846 -23280 0
 23276 -23277  23278  846  23281 0

c  1-1 --> 0
c    (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0 ∧ -p_846) -> (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧ -b^{282, 4}_0)
c  in CNF:
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_2
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_1
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_0
c  in DIMACS:
 23276  23277 -23278  846 -23279 0
 23276  23277 -23278  846 -23280 0
 23276  23277 -23278  846 -23281 0

c  0-1 --> -1
c    (-b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧ -p_846) -> ( b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0)
c  in CNF:
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨  b^{282, 4}_2
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_1
c     b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨  b^{282, 4}_0
c  in DIMACS:
 23276  23277  23278  846  23279 0
 23276  23277  23278  846 -23280 0
 23276  23277  23278  846  23281 0

c  -1-1 --> -2
c    ( b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧  b^{282, 3}_0 ∧ -p_846) -> ( b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0)
c  in CNF:
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨  b^{282, 4}_2
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨  b^{282, 4}_1
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨  p_846 ∨ -b^{282, 4}_0
c  in DIMACS:
-23276  23277 -23278  846  23279 0
-23276  23277 -23278  846  23280 0
-23276  23277 -23278  846 -23281 0

c  -2-1 --> break 
c    ( b^{282, 3}_2 ∧  b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧ -p_846) -> break
c  in CNF:
c    -b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨  b^{282, 3}_0 ∨  p_846 ∨ break
c  in DIMACS:
-23276 -23277  23278  846 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{282, 3}_2 ∧ -b^{282, 3}_1 ∧ -b^{282, 3}_0 ∧ true) 
c  in CNF:
c    -b^{282, 3}_2 ∨  b^{282, 3}_1 ∨  b^{282, 3}_0 ∨ false 
c  in DIMACS:
-23276  23277  23278  0

c  3 does not represent an automaton state.
c    -(-b^{282, 3}_2 ∧  b^{282, 3}_1 ∧  b^{282, 3}_0 ∧ true) 
c  in CNF:
c     b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ false 
c  in DIMACS:
 23276 -23277 -23278  0
c  -3 does not represent an automaton state.
c    -( b^{282, 3}_2 ∧  b^{282, 3}_1 ∧  b^{282, 3}_0 ∧ true) 
c  in CNF:
c    -b^{282, 3}_2 ∨ -b^{282, 3}_1 ∨ -b^{282, 3}_0 ∨ false 
c  in DIMACS:
-23276 -23277 -23278  0

c i = 4
c  -2+1 --> -1
c    ( b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧  p_1128) -> ( b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧  b^{282, 5}_0)
c  in CNF:
c    -b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨  b^{282, 5}_2
c    -b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_1
c    -b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨  b^{282, 5}_0
c  in DIMACS:
-23279 -23280  23281 -1128  23282 0
-23279 -23280  23281 -1128 -23283 0
-23279 -23280  23281 -1128  23284 0

c  -1+1 --> 0
c    ( b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0 ∧  p_1128) -> (-b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧ -b^{282, 5}_0)
c  in CNF:
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_2
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_1
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_0
c  in DIMACS:
-23279  23280 -23281 -1128 -23282 0
-23279  23280 -23281 -1128 -23283 0
-23279  23280 -23281 -1128 -23284 0

c  0+1 --> 1
c    (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧  p_1128) -> (-b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧  b^{282, 5}_0)
c  in CNF:
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_2
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_1
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨  b^{282, 5}_0
c  in DIMACS:
 23279  23280  23281 -1128 -23282 0
 23279  23280  23281 -1128 -23283 0
 23279  23280  23281 -1128  23284 0

c  1+1 --> 2
c    (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0 ∧  p_1128) -> (-b^{282, 5}_2 ∧  b^{282, 5}_1 ∧ -b^{282, 5}_0)
c  in CNF:
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_2
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨  b^{282, 5}_1
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ -p_1128 ∨ -b^{282, 5}_0
c  in DIMACS:
 23279  23280 -23281 -1128 -23282 0
 23279  23280 -23281 -1128  23283 0
 23279  23280 -23281 -1128 -23284 0

c  2+1 --> break 
c    (-b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 23279 -23280  23281 -1128 1162 0


c  2-1 --> 1
c    (-b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧ -p_1128) -> (-b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧  b^{282, 5}_0)
c  in CNF:
c     b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_2
c     b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_1
c     b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨  b^{282, 5}_0
c  in DIMACS:
 23279 -23280  23281  1128 -23282 0
 23279 -23280  23281  1128 -23283 0
 23279 -23280  23281  1128  23284 0

c  1-1 --> 0
c    (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0 ∧ -p_1128) -> (-b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧ -b^{282, 5}_0)
c  in CNF:
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_2
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_1
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_0
c  in DIMACS:
 23279  23280 -23281  1128 -23282 0
 23279  23280 -23281  1128 -23283 0
 23279  23280 -23281  1128 -23284 0

c  0-1 --> -1
c    (-b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧ -p_1128) -> ( b^{282, 5}_2 ∧ -b^{282, 5}_1 ∧  b^{282, 5}_0)
c  in CNF:
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨  b^{282, 5}_2
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_1
c     b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨  b^{282, 5}_0
c  in DIMACS:
 23279  23280  23281  1128  23282 0
 23279  23280  23281  1128 -23283 0
 23279  23280  23281  1128  23284 0

c  -1-1 --> -2
c    ( b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧  b^{282, 4}_0 ∧ -p_1128) -> ( b^{282, 5}_2 ∧  b^{282, 5}_1 ∧ -b^{282, 5}_0)
c  in CNF:
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨  b^{282, 5}_2
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨  b^{282, 5}_1
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨  p_1128 ∨ -b^{282, 5}_0
c  in DIMACS:
-23279  23280 -23281  1128  23282 0
-23279  23280 -23281  1128  23283 0
-23279  23280 -23281  1128 -23284 0

c  -2-1 --> break 
c    ( b^{282, 4}_2 ∧  b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨  b^{282, 4}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-23279 -23280  23281  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{282, 4}_2 ∧ -b^{282, 4}_1 ∧ -b^{282, 4}_0 ∧ true) 
c  in CNF:
c    -b^{282, 4}_2 ∨  b^{282, 4}_1 ∨  b^{282, 4}_0 ∨ false 
c  in DIMACS:
-23279  23280  23281  0

c  3 does not represent an automaton state.
c    -(-b^{282, 4}_2 ∧  b^{282, 4}_1 ∧  b^{282, 4}_0 ∧ true) 
c  in CNF:
c     b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ false 
c  in DIMACS:
 23279 -23280 -23281  0
c  -3 does not represent an automaton state.
c    -( b^{282, 4}_2 ∧  b^{282, 4}_1 ∧  b^{282, 4}_0 ∧ true) 
c  in CNF:
c    -b^{282, 4}_2 ∨ -b^{282, 4}_1 ∨ -b^{282, 4}_0 ∨ false 
c  in DIMACS:
-23279 -23280 -23281  0

c INIT for k = 283
c    -b^{283, 1}_2
c    -b^{283, 1}_1
c    -b^{283, 1}_0
c  in DIMACS:
-23285 0
-23286 0
-23287 0

c Transitions for k = 283
c i = 1
c  -2+1 --> -1
c    ( b^{283, 1}_2 ∧  b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧  p_283) -> ( b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0)
c  in CNF:
c    -b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨  b^{283, 2}_2
c    -b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_1
c    -b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨  b^{283, 2}_0
c  in DIMACS:
-23285 -23286  23287 -283  23288 0
-23285 -23286  23287 -283 -23289 0
-23285 -23286  23287 -283  23290 0

c  -1+1 --> 0
c    ( b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧  b^{283, 1}_0 ∧  p_283) -> (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧ -b^{283, 2}_0)
c  in CNF:
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_2
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_1
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_0
c  in DIMACS:
-23285  23286 -23287 -283 -23288 0
-23285  23286 -23287 -283 -23289 0
-23285  23286 -23287 -283 -23290 0

c  0+1 --> 1
c    (-b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧  p_283) -> (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0)
c  in CNF:
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_2
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_1
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨  b^{283, 2}_0
c  in DIMACS:
 23285  23286  23287 -283 -23288 0
 23285  23286  23287 -283 -23289 0
 23285  23286  23287 -283  23290 0

c  1+1 --> 2
c    (-b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧  b^{283, 1}_0 ∧  p_283) -> (-b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0)
c  in CNF:
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_2
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨  b^{283, 2}_1
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ -p_283 ∨ -b^{283, 2}_0
c  in DIMACS:
 23285  23286 -23287 -283 -23288 0
 23285  23286 -23287 -283  23289 0
 23285  23286 -23287 -283 -23290 0

c  2+1 --> break 
c    (-b^{283, 1}_2 ∧  b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧  p_283) -> break
c  in CNF:
c     b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ -p_283 ∨ break
c  in DIMACS:
 23285 -23286  23287 -283 1162 0


c  2-1 --> 1
c    (-b^{283, 1}_2 ∧  b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧ -p_283) -> (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0)
c  in CNF:
c     b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_2
c     b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_1
c     b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨  b^{283, 2}_0
c  in DIMACS:
 23285 -23286  23287  283 -23288 0
 23285 -23286  23287  283 -23289 0
 23285 -23286  23287  283  23290 0

c  1-1 --> 0
c    (-b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧  b^{283, 1}_0 ∧ -p_283) -> (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧ -b^{283, 2}_0)
c  in CNF:
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_2
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_1
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_0
c  in DIMACS:
 23285  23286 -23287  283 -23288 0
 23285  23286 -23287  283 -23289 0
 23285  23286 -23287  283 -23290 0

c  0-1 --> -1
c    (-b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧ -p_283) -> ( b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0)
c  in CNF:
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨  b^{283, 2}_2
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_1
c     b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨  b^{283, 2}_0
c  in DIMACS:
 23285  23286  23287  283  23288 0
 23285  23286  23287  283 -23289 0
 23285  23286  23287  283  23290 0

c  -1-1 --> -2
c    ( b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧  b^{283, 1}_0 ∧ -p_283) -> ( b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0)
c  in CNF:
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨  b^{283, 2}_2
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨  b^{283, 2}_1
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨  p_283 ∨ -b^{283, 2}_0
c  in DIMACS:
-23285  23286 -23287  283  23288 0
-23285  23286 -23287  283  23289 0
-23285  23286 -23287  283 -23290 0

c  -2-1 --> break 
c    ( b^{283, 1}_2 ∧  b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧ -p_283) -> break
c  in CNF:
c    -b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨  b^{283, 1}_0 ∨  p_283 ∨ break
c  in DIMACS:
-23285 -23286  23287  283 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{283, 1}_2 ∧ -b^{283, 1}_1 ∧ -b^{283, 1}_0 ∧ true) 
c  in CNF:
c    -b^{283, 1}_2 ∨  b^{283, 1}_1 ∨  b^{283, 1}_0 ∨ false 
c  in DIMACS:
-23285  23286  23287  0

c  3 does not represent an automaton state.
c    -(-b^{283, 1}_2 ∧  b^{283, 1}_1 ∧  b^{283, 1}_0 ∧ true) 
c  in CNF:
c     b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ false 
c  in DIMACS:
 23285 -23286 -23287  0
c  -3 does not represent an automaton state.
c    -( b^{283, 1}_2 ∧  b^{283, 1}_1 ∧  b^{283, 1}_0 ∧ true) 
c  in CNF:
c    -b^{283, 1}_2 ∨ -b^{283, 1}_1 ∨ -b^{283, 1}_0 ∨ false 
c  in DIMACS:
-23285 -23286 -23287  0

c i = 2
c  -2+1 --> -1
c    ( b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧  p_566) -> ( b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0)
c  in CNF:
c    -b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨  b^{283, 3}_2
c    -b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_1
c    -b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨  b^{283, 3}_0
c  in DIMACS:
-23288 -23289  23290 -566  23291 0
-23288 -23289  23290 -566 -23292 0
-23288 -23289  23290 -566  23293 0

c  -1+1 --> 0
c    ( b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0 ∧  p_566) -> (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧ -b^{283, 3}_0)
c  in CNF:
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_2
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_1
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_0
c  in DIMACS:
-23288  23289 -23290 -566 -23291 0
-23288  23289 -23290 -566 -23292 0
-23288  23289 -23290 -566 -23293 0

c  0+1 --> 1
c    (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧  p_566) -> (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0)
c  in CNF:
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_2
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_1
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨  b^{283, 3}_0
c  in DIMACS:
 23288  23289  23290 -566 -23291 0
 23288  23289  23290 -566 -23292 0
 23288  23289  23290 -566  23293 0

c  1+1 --> 2
c    (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0 ∧  p_566) -> (-b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0)
c  in CNF:
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_2
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨  b^{283, 3}_1
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ -p_566 ∨ -b^{283, 3}_0
c  in DIMACS:
 23288  23289 -23290 -566 -23291 0
 23288  23289 -23290 -566  23292 0
 23288  23289 -23290 -566 -23293 0

c  2+1 --> break 
c    (-b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧  p_566) -> break
c  in CNF:
c     b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ -p_566 ∨ break
c  in DIMACS:
 23288 -23289  23290 -566 1162 0


c  2-1 --> 1
c    (-b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧ -p_566) -> (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0)
c  in CNF:
c     b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_2
c     b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_1
c     b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨  b^{283, 3}_0
c  in DIMACS:
 23288 -23289  23290  566 -23291 0
 23288 -23289  23290  566 -23292 0
 23288 -23289  23290  566  23293 0

c  1-1 --> 0
c    (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0 ∧ -p_566) -> (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧ -b^{283, 3}_0)
c  in CNF:
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_2
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_1
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_0
c  in DIMACS:
 23288  23289 -23290  566 -23291 0
 23288  23289 -23290  566 -23292 0
 23288  23289 -23290  566 -23293 0

c  0-1 --> -1
c    (-b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧ -p_566) -> ( b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0)
c  in CNF:
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨  b^{283, 3}_2
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_1
c     b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨  b^{283, 3}_0
c  in DIMACS:
 23288  23289  23290  566  23291 0
 23288  23289  23290  566 -23292 0
 23288  23289  23290  566  23293 0

c  -1-1 --> -2
c    ( b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧  b^{283, 2}_0 ∧ -p_566) -> ( b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0)
c  in CNF:
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨  b^{283, 3}_2
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨  b^{283, 3}_1
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨  p_566 ∨ -b^{283, 3}_0
c  in DIMACS:
-23288  23289 -23290  566  23291 0
-23288  23289 -23290  566  23292 0
-23288  23289 -23290  566 -23293 0

c  -2-1 --> break 
c    ( b^{283, 2}_2 ∧  b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧ -p_566) -> break
c  in CNF:
c    -b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨  b^{283, 2}_0 ∨  p_566 ∨ break
c  in DIMACS:
-23288 -23289  23290  566 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{283, 2}_2 ∧ -b^{283, 2}_1 ∧ -b^{283, 2}_0 ∧ true) 
c  in CNF:
c    -b^{283, 2}_2 ∨  b^{283, 2}_1 ∨  b^{283, 2}_0 ∨ false 
c  in DIMACS:
-23288  23289  23290  0

c  3 does not represent an automaton state.
c    -(-b^{283, 2}_2 ∧  b^{283, 2}_1 ∧  b^{283, 2}_0 ∧ true) 
c  in CNF:
c     b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ false 
c  in DIMACS:
 23288 -23289 -23290  0
c  -3 does not represent an automaton state.
c    -( b^{283, 2}_2 ∧  b^{283, 2}_1 ∧  b^{283, 2}_0 ∧ true) 
c  in CNF:
c    -b^{283, 2}_2 ∨ -b^{283, 2}_1 ∨ -b^{283, 2}_0 ∨ false 
c  in DIMACS:
-23288 -23289 -23290  0

c i = 3
c  -2+1 --> -1
c    ( b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧  p_849) -> ( b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0)
c  in CNF:
c    -b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨  b^{283, 4}_2
c    -b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_1
c    -b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨  b^{283, 4}_0
c  in DIMACS:
-23291 -23292  23293 -849  23294 0
-23291 -23292  23293 -849 -23295 0
-23291 -23292  23293 -849  23296 0

c  -1+1 --> 0
c    ( b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0 ∧  p_849) -> (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧ -b^{283, 4}_0)
c  in CNF:
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_2
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_1
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_0
c  in DIMACS:
-23291  23292 -23293 -849 -23294 0
-23291  23292 -23293 -849 -23295 0
-23291  23292 -23293 -849 -23296 0

c  0+1 --> 1
c    (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧  p_849) -> (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0)
c  in CNF:
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_2
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_1
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨  b^{283, 4}_0
c  in DIMACS:
 23291  23292  23293 -849 -23294 0
 23291  23292  23293 -849 -23295 0
 23291  23292  23293 -849  23296 0

c  1+1 --> 2
c    (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0 ∧  p_849) -> (-b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0)
c  in CNF:
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_2
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨  b^{283, 4}_1
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ -p_849 ∨ -b^{283, 4}_0
c  in DIMACS:
 23291  23292 -23293 -849 -23294 0
 23291  23292 -23293 -849  23295 0
 23291  23292 -23293 -849 -23296 0

c  2+1 --> break 
c    (-b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧  p_849) -> break
c  in CNF:
c     b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ -p_849 ∨ break
c  in DIMACS:
 23291 -23292  23293 -849 1162 0


c  2-1 --> 1
c    (-b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧ -p_849) -> (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0)
c  in CNF:
c     b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_2
c     b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_1
c     b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨  b^{283, 4}_0
c  in DIMACS:
 23291 -23292  23293  849 -23294 0
 23291 -23292  23293  849 -23295 0
 23291 -23292  23293  849  23296 0

c  1-1 --> 0
c    (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0 ∧ -p_849) -> (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧ -b^{283, 4}_0)
c  in CNF:
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_2
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_1
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_0
c  in DIMACS:
 23291  23292 -23293  849 -23294 0
 23291  23292 -23293  849 -23295 0
 23291  23292 -23293  849 -23296 0

c  0-1 --> -1
c    (-b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧ -p_849) -> ( b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0)
c  in CNF:
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨  b^{283, 4}_2
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_1
c     b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨  b^{283, 4}_0
c  in DIMACS:
 23291  23292  23293  849  23294 0
 23291  23292  23293  849 -23295 0
 23291  23292  23293  849  23296 0

c  -1-1 --> -2
c    ( b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧  b^{283, 3}_0 ∧ -p_849) -> ( b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0)
c  in CNF:
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨  b^{283, 4}_2
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨  b^{283, 4}_1
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨  p_849 ∨ -b^{283, 4}_0
c  in DIMACS:
-23291  23292 -23293  849  23294 0
-23291  23292 -23293  849  23295 0
-23291  23292 -23293  849 -23296 0

c  -2-1 --> break 
c    ( b^{283, 3}_2 ∧  b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧ -p_849) -> break
c  in CNF:
c    -b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨  b^{283, 3}_0 ∨  p_849 ∨ break
c  in DIMACS:
-23291 -23292  23293  849 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{283, 3}_2 ∧ -b^{283, 3}_1 ∧ -b^{283, 3}_0 ∧ true) 
c  in CNF:
c    -b^{283, 3}_2 ∨  b^{283, 3}_1 ∨  b^{283, 3}_0 ∨ false 
c  in DIMACS:
-23291  23292  23293  0

c  3 does not represent an automaton state.
c    -(-b^{283, 3}_2 ∧  b^{283, 3}_1 ∧  b^{283, 3}_0 ∧ true) 
c  in CNF:
c     b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ false 
c  in DIMACS:
 23291 -23292 -23293  0
c  -3 does not represent an automaton state.
c    -( b^{283, 3}_2 ∧  b^{283, 3}_1 ∧  b^{283, 3}_0 ∧ true) 
c  in CNF:
c    -b^{283, 3}_2 ∨ -b^{283, 3}_1 ∨ -b^{283, 3}_0 ∨ false 
c  in DIMACS:
-23291 -23292 -23293  0

c i = 4
c  -2+1 --> -1
c    ( b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧  p_1132) -> ( b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧  b^{283, 5}_0)
c  in CNF:
c    -b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨  b^{283, 5}_2
c    -b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_1
c    -b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨  b^{283, 5}_0
c  in DIMACS:
-23294 -23295  23296 -1132  23297 0
-23294 -23295  23296 -1132 -23298 0
-23294 -23295  23296 -1132  23299 0

c  -1+1 --> 0
c    ( b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0 ∧  p_1132) -> (-b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧ -b^{283, 5}_0)
c  in CNF:
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_2
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_1
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_0
c  in DIMACS:
-23294  23295 -23296 -1132 -23297 0
-23294  23295 -23296 -1132 -23298 0
-23294  23295 -23296 -1132 -23299 0

c  0+1 --> 1
c    (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧  p_1132) -> (-b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧  b^{283, 5}_0)
c  in CNF:
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_2
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_1
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨  b^{283, 5}_0
c  in DIMACS:
 23294  23295  23296 -1132 -23297 0
 23294  23295  23296 -1132 -23298 0
 23294  23295  23296 -1132  23299 0

c  1+1 --> 2
c    (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0 ∧  p_1132) -> (-b^{283, 5}_2 ∧  b^{283, 5}_1 ∧ -b^{283, 5}_0)
c  in CNF:
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_2
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨  b^{283, 5}_1
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ -p_1132 ∨ -b^{283, 5}_0
c  in DIMACS:
 23294  23295 -23296 -1132 -23297 0
 23294  23295 -23296 -1132  23298 0
 23294  23295 -23296 -1132 -23299 0

c  2+1 --> break 
c    (-b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧  p_1132) -> break
c  in CNF:
c     b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ -p_1132 ∨ break
c  in DIMACS:
 23294 -23295  23296 -1132 1162 0


c  2-1 --> 1
c    (-b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧ -p_1132) -> (-b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧  b^{283, 5}_0)
c  in CNF:
c     b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_2
c     b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_1
c     b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨  b^{283, 5}_0
c  in DIMACS:
 23294 -23295  23296  1132 -23297 0
 23294 -23295  23296  1132 -23298 0
 23294 -23295  23296  1132  23299 0

c  1-1 --> 0
c    (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0 ∧ -p_1132) -> (-b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧ -b^{283, 5}_0)
c  in CNF:
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_2
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_1
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_0
c  in DIMACS:
 23294  23295 -23296  1132 -23297 0
 23294  23295 -23296  1132 -23298 0
 23294  23295 -23296  1132 -23299 0

c  0-1 --> -1
c    (-b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧ -p_1132) -> ( b^{283, 5}_2 ∧ -b^{283, 5}_1 ∧  b^{283, 5}_0)
c  in CNF:
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨  b^{283, 5}_2
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_1
c     b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨  b^{283, 5}_0
c  in DIMACS:
 23294  23295  23296  1132  23297 0
 23294  23295  23296  1132 -23298 0
 23294  23295  23296  1132  23299 0

c  -1-1 --> -2
c    ( b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧  b^{283, 4}_0 ∧ -p_1132) -> ( b^{283, 5}_2 ∧  b^{283, 5}_1 ∧ -b^{283, 5}_0)
c  in CNF:
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨  b^{283, 5}_2
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨  b^{283, 5}_1
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨  p_1132 ∨ -b^{283, 5}_0
c  in DIMACS:
-23294  23295 -23296  1132  23297 0
-23294  23295 -23296  1132  23298 0
-23294  23295 -23296  1132 -23299 0

c  -2-1 --> break 
c    ( b^{283, 4}_2 ∧  b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧ -p_1132) -> break
c  in CNF:
c    -b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨  b^{283, 4}_0 ∨  p_1132 ∨ break
c  in DIMACS:
-23294 -23295  23296  1132 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{283, 4}_2 ∧ -b^{283, 4}_1 ∧ -b^{283, 4}_0 ∧ true) 
c  in CNF:
c    -b^{283, 4}_2 ∨  b^{283, 4}_1 ∨  b^{283, 4}_0 ∨ false 
c  in DIMACS:
-23294  23295  23296  0

c  3 does not represent an automaton state.
c    -(-b^{283, 4}_2 ∧  b^{283, 4}_1 ∧  b^{283, 4}_0 ∧ true) 
c  in CNF:
c     b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ false 
c  in DIMACS:
 23294 -23295 -23296  0
c  -3 does not represent an automaton state.
c    -( b^{283, 4}_2 ∧  b^{283, 4}_1 ∧  b^{283, 4}_0 ∧ true) 
c  in CNF:
c    -b^{283, 4}_2 ∨ -b^{283, 4}_1 ∨ -b^{283, 4}_0 ∨ false 
c  in DIMACS:
-23294 -23295 -23296  0

c INIT for k = 284
c    -b^{284, 1}_2
c    -b^{284, 1}_1
c    -b^{284, 1}_0
c  in DIMACS:
-23300 0
-23301 0
-23302 0

c Transitions for k = 284
c i = 1
c  -2+1 --> -1
c    ( b^{284, 1}_2 ∧  b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧  p_284) -> ( b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0)
c  in CNF:
c    -b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨  b^{284, 2}_2
c    -b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_1
c    -b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨  b^{284, 2}_0
c  in DIMACS:
-23300 -23301  23302 -284  23303 0
-23300 -23301  23302 -284 -23304 0
-23300 -23301  23302 -284  23305 0

c  -1+1 --> 0
c    ( b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧  b^{284, 1}_0 ∧  p_284) -> (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧ -b^{284, 2}_0)
c  in CNF:
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_2
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_1
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_0
c  in DIMACS:
-23300  23301 -23302 -284 -23303 0
-23300  23301 -23302 -284 -23304 0
-23300  23301 -23302 -284 -23305 0

c  0+1 --> 1
c    (-b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧  p_284) -> (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0)
c  in CNF:
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_2
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_1
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨  b^{284, 2}_0
c  in DIMACS:
 23300  23301  23302 -284 -23303 0
 23300  23301  23302 -284 -23304 0
 23300  23301  23302 -284  23305 0

c  1+1 --> 2
c    (-b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧  b^{284, 1}_0 ∧  p_284) -> (-b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0)
c  in CNF:
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_2
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨  b^{284, 2}_1
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ -p_284 ∨ -b^{284, 2}_0
c  in DIMACS:
 23300  23301 -23302 -284 -23303 0
 23300  23301 -23302 -284  23304 0
 23300  23301 -23302 -284 -23305 0

c  2+1 --> break 
c    (-b^{284, 1}_2 ∧  b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧  p_284) -> break
c  in CNF:
c     b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ -p_284 ∨ break
c  in DIMACS:
 23300 -23301  23302 -284 1162 0


c  2-1 --> 1
c    (-b^{284, 1}_2 ∧  b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧ -p_284) -> (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0)
c  in CNF:
c     b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_2
c     b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_1
c     b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨  b^{284, 2}_0
c  in DIMACS:
 23300 -23301  23302  284 -23303 0
 23300 -23301  23302  284 -23304 0
 23300 -23301  23302  284  23305 0

c  1-1 --> 0
c    (-b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧  b^{284, 1}_0 ∧ -p_284) -> (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧ -b^{284, 2}_0)
c  in CNF:
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_2
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_1
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_0
c  in DIMACS:
 23300  23301 -23302  284 -23303 0
 23300  23301 -23302  284 -23304 0
 23300  23301 -23302  284 -23305 0

c  0-1 --> -1
c    (-b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧ -p_284) -> ( b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0)
c  in CNF:
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨  b^{284, 2}_2
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_1
c     b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨  b^{284, 2}_0
c  in DIMACS:
 23300  23301  23302  284  23303 0
 23300  23301  23302  284 -23304 0
 23300  23301  23302  284  23305 0

c  -1-1 --> -2
c    ( b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧  b^{284, 1}_0 ∧ -p_284) -> ( b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0)
c  in CNF:
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨  b^{284, 2}_2
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨  b^{284, 2}_1
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨  p_284 ∨ -b^{284, 2}_0
c  in DIMACS:
-23300  23301 -23302  284  23303 0
-23300  23301 -23302  284  23304 0
-23300  23301 -23302  284 -23305 0

c  -2-1 --> break 
c    ( b^{284, 1}_2 ∧  b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧ -p_284) -> break
c  in CNF:
c    -b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨  b^{284, 1}_0 ∨  p_284 ∨ break
c  in DIMACS:
-23300 -23301  23302  284 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{284, 1}_2 ∧ -b^{284, 1}_1 ∧ -b^{284, 1}_0 ∧ true) 
c  in CNF:
c    -b^{284, 1}_2 ∨  b^{284, 1}_1 ∨  b^{284, 1}_0 ∨ false 
c  in DIMACS:
-23300  23301  23302  0

c  3 does not represent an automaton state.
c    -(-b^{284, 1}_2 ∧  b^{284, 1}_1 ∧  b^{284, 1}_0 ∧ true) 
c  in CNF:
c     b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ false 
c  in DIMACS:
 23300 -23301 -23302  0
c  -3 does not represent an automaton state.
c    -( b^{284, 1}_2 ∧  b^{284, 1}_1 ∧  b^{284, 1}_0 ∧ true) 
c  in CNF:
c    -b^{284, 1}_2 ∨ -b^{284, 1}_1 ∨ -b^{284, 1}_0 ∨ false 
c  in DIMACS:
-23300 -23301 -23302  0

c i = 2
c  -2+1 --> -1
c    ( b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧  p_568) -> ( b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0)
c  in CNF:
c    -b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨  b^{284, 3}_2
c    -b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_1
c    -b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨  b^{284, 3}_0
c  in DIMACS:
-23303 -23304  23305 -568  23306 0
-23303 -23304  23305 -568 -23307 0
-23303 -23304  23305 -568  23308 0

c  -1+1 --> 0
c    ( b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0 ∧  p_568) -> (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧ -b^{284, 3}_0)
c  in CNF:
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_2
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_1
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_0
c  in DIMACS:
-23303  23304 -23305 -568 -23306 0
-23303  23304 -23305 -568 -23307 0
-23303  23304 -23305 -568 -23308 0

c  0+1 --> 1
c    (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧  p_568) -> (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0)
c  in CNF:
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_2
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_1
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨  b^{284, 3}_0
c  in DIMACS:
 23303  23304  23305 -568 -23306 0
 23303  23304  23305 -568 -23307 0
 23303  23304  23305 -568  23308 0

c  1+1 --> 2
c    (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0 ∧  p_568) -> (-b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0)
c  in CNF:
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_2
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨  b^{284, 3}_1
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ -p_568 ∨ -b^{284, 3}_0
c  in DIMACS:
 23303  23304 -23305 -568 -23306 0
 23303  23304 -23305 -568  23307 0
 23303  23304 -23305 -568 -23308 0

c  2+1 --> break 
c    (-b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧  p_568) -> break
c  in CNF:
c     b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ -p_568 ∨ break
c  in DIMACS:
 23303 -23304  23305 -568 1162 0


c  2-1 --> 1
c    (-b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧ -p_568) -> (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0)
c  in CNF:
c     b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_2
c     b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_1
c     b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨  b^{284, 3}_0
c  in DIMACS:
 23303 -23304  23305  568 -23306 0
 23303 -23304  23305  568 -23307 0
 23303 -23304  23305  568  23308 0

c  1-1 --> 0
c    (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0 ∧ -p_568) -> (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧ -b^{284, 3}_0)
c  in CNF:
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_2
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_1
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_0
c  in DIMACS:
 23303  23304 -23305  568 -23306 0
 23303  23304 -23305  568 -23307 0
 23303  23304 -23305  568 -23308 0

c  0-1 --> -1
c    (-b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧ -p_568) -> ( b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0)
c  in CNF:
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨  b^{284, 3}_2
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_1
c     b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨  b^{284, 3}_0
c  in DIMACS:
 23303  23304  23305  568  23306 0
 23303  23304  23305  568 -23307 0
 23303  23304  23305  568  23308 0

c  -1-1 --> -2
c    ( b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧  b^{284, 2}_0 ∧ -p_568) -> ( b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0)
c  in CNF:
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨  b^{284, 3}_2
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨  b^{284, 3}_1
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨  p_568 ∨ -b^{284, 3}_0
c  in DIMACS:
-23303  23304 -23305  568  23306 0
-23303  23304 -23305  568  23307 0
-23303  23304 -23305  568 -23308 0

c  -2-1 --> break 
c    ( b^{284, 2}_2 ∧  b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧ -p_568) -> break
c  in CNF:
c    -b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨  b^{284, 2}_0 ∨  p_568 ∨ break
c  in DIMACS:
-23303 -23304  23305  568 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{284, 2}_2 ∧ -b^{284, 2}_1 ∧ -b^{284, 2}_0 ∧ true) 
c  in CNF:
c    -b^{284, 2}_2 ∨  b^{284, 2}_1 ∨  b^{284, 2}_0 ∨ false 
c  in DIMACS:
-23303  23304  23305  0

c  3 does not represent an automaton state.
c    -(-b^{284, 2}_2 ∧  b^{284, 2}_1 ∧  b^{284, 2}_0 ∧ true) 
c  in CNF:
c     b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ false 
c  in DIMACS:
 23303 -23304 -23305  0
c  -3 does not represent an automaton state.
c    -( b^{284, 2}_2 ∧  b^{284, 2}_1 ∧  b^{284, 2}_0 ∧ true) 
c  in CNF:
c    -b^{284, 2}_2 ∨ -b^{284, 2}_1 ∨ -b^{284, 2}_0 ∨ false 
c  in DIMACS:
-23303 -23304 -23305  0

c i = 3
c  -2+1 --> -1
c    ( b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧  p_852) -> ( b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0)
c  in CNF:
c    -b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨  b^{284, 4}_2
c    -b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_1
c    -b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨  b^{284, 4}_0
c  in DIMACS:
-23306 -23307  23308 -852  23309 0
-23306 -23307  23308 -852 -23310 0
-23306 -23307  23308 -852  23311 0

c  -1+1 --> 0
c    ( b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0 ∧  p_852) -> (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧ -b^{284, 4}_0)
c  in CNF:
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_2
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_1
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_0
c  in DIMACS:
-23306  23307 -23308 -852 -23309 0
-23306  23307 -23308 -852 -23310 0
-23306  23307 -23308 -852 -23311 0

c  0+1 --> 1
c    (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧  p_852) -> (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0)
c  in CNF:
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_2
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_1
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨  b^{284, 4}_0
c  in DIMACS:
 23306  23307  23308 -852 -23309 0
 23306  23307  23308 -852 -23310 0
 23306  23307  23308 -852  23311 0

c  1+1 --> 2
c    (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0 ∧  p_852) -> (-b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0)
c  in CNF:
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_2
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨  b^{284, 4}_1
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ -p_852 ∨ -b^{284, 4}_0
c  in DIMACS:
 23306  23307 -23308 -852 -23309 0
 23306  23307 -23308 -852  23310 0
 23306  23307 -23308 -852 -23311 0

c  2+1 --> break 
c    (-b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧  p_852) -> break
c  in CNF:
c     b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ -p_852 ∨ break
c  in DIMACS:
 23306 -23307  23308 -852 1162 0


c  2-1 --> 1
c    (-b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧ -p_852) -> (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0)
c  in CNF:
c     b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_2
c     b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_1
c     b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨  b^{284, 4}_0
c  in DIMACS:
 23306 -23307  23308  852 -23309 0
 23306 -23307  23308  852 -23310 0
 23306 -23307  23308  852  23311 0

c  1-1 --> 0
c    (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0 ∧ -p_852) -> (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧ -b^{284, 4}_0)
c  in CNF:
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_2
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_1
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_0
c  in DIMACS:
 23306  23307 -23308  852 -23309 0
 23306  23307 -23308  852 -23310 0
 23306  23307 -23308  852 -23311 0

c  0-1 --> -1
c    (-b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧ -p_852) -> ( b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0)
c  in CNF:
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨  b^{284, 4}_2
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_1
c     b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨  b^{284, 4}_0
c  in DIMACS:
 23306  23307  23308  852  23309 0
 23306  23307  23308  852 -23310 0
 23306  23307  23308  852  23311 0

c  -1-1 --> -2
c    ( b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧  b^{284, 3}_0 ∧ -p_852) -> ( b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0)
c  in CNF:
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨  b^{284, 4}_2
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨  b^{284, 4}_1
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨  p_852 ∨ -b^{284, 4}_0
c  in DIMACS:
-23306  23307 -23308  852  23309 0
-23306  23307 -23308  852  23310 0
-23306  23307 -23308  852 -23311 0

c  -2-1 --> break 
c    ( b^{284, 3}_2 ∧  b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧ -p_852) -> break
c  in CNF:
c    -b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨  b^{284, 3}_0 ∨  p_852 ∨ break
c  in DIMACS:
-23306 -23307  23308  852 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{284, 3}_2 ∧ -b^{284, 3}_1 ∧ -b^{284, 3}_0 ∧ true) 
c  in CNF:
c    -b^{284, 3}_2 ∨  b^{284, 3}_1 ∨  b^{284, 3}_0 ∨ false 
c  in DIMACS:
-23306  23307  23308  0

c  3 does not represent an automaton state.
c    -(-b^{284, 3}_2 ∧  b^{284, 3}_1 ∧  b^{284, 3}_0 ∧ true) 
c  in CNF:
c     b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ false 
c  in DIMACS:
 23306 -23307 -23308  0
c  -3 does not represent an automaton state.
c    -( b^{284, 3}_2 ∧  b^{284, 3}_1 ∧  b^{284, 3}_0 ∧ true) 
c  in CNF:
c    -b^{284, 3}_2 ∨ -b^{284, 3}_1 ∨ -b^{284, 3}_0 ∨ false 
c  in DIMACS:
-23306 -23307 -23308  0

c i = 4
c  -2+1 --> -1
c    ( b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧  p_1136) -> ( b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧  b^{284, 5}_0)
c  in CNF:
c    -b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨  b^{284, 5}_2
c    -b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_1
c    -b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨  b^{284, 5}_0
c  in DIMACS:
-23309 -23310  23311 -1136  23312 0
-23309 -23310  23311 -1136 -23313 0
-23309 -23310  23311 -1136  23314 0

c  -1+1 --> 0
c    ( b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0 ∧  p_1136) -> (-b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧ -b^{284, 5}_0)
c  in CNF:
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_2
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_1
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_0
c  in DIMACS:
-23309  23310 -23311 -1136 -23312 0
-23309  23310 -23311 -1136 -23313 0
-23309  23310 -23311 -1136 -23314 0

c  0+1 --> 1
c    (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧  p_1136) -> (-b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧  b^{284, 5}_0)
c  in CNF:
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_2
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_1
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨  b^{284, 5}_0
c  in DIMACS:
 23309  23310  23311 -1136 -23312 0
 23309  23310  23311 -1136 -23313 0
 23309  23310  23311 -1136  23314 0

c  1+1 --> 2
c    (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0 ∧  p_1136) -> (-b^{284, 5}_2 ∧  b^{284, 5}_1 ∧ -b^{284, 5}_0)
c  in CNF:
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_2
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨  b^{284, 5}_1
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ -p_1136 ∨ -b^{284, 5}_0
c  in DIMACS:
 23309  23310 -23311 -1136 -23312 0
 23309  23310 -23311 -1136  23313 0
 23309  23310 -23311 -1136 -23314 0

c  2+1 --> break 
c    (-b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧  p_1136) -> break
c  in CNF:
c     b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ -p_1136 ∨ break
c  in DIMACS:
 23309 -23310  23311 -1136 1162 0


c  2-1 --> 1
c    (-b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧ -p_1136) -> (-b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧  b^{284, 5}_0)
c  in CNF:
c     b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_2
c     b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_1
c     b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨  b^{284, 5}_0
c  in DIMACS:
 23309 -23310  23311  1136 -23312 0
 23309 -23310  23311  1136 -23313 0
 23309 -23310  23311  1136  23314 0

c  1-1 --> 0
c    (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0 ∧ -p_1136) -> (-b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧ -b^{284, 5}_0)
c  in CNF:
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_2
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_1
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_0
c  in DIMACS:
 23309  23310 -23311  1136 -23312 0
 23309  23310 -23311  1136 -23313 0
 23309  23310 -23311  1136 -23314 0

c  0-1 --> -1
c    (-b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧ -p_1136) -> ( b^{284, 5}_2 ∧ -b^{284, 5}_1 ∧  b^{284, 5}_0)
c  in CNF:
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨  b^{284, 5}_2
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_1
c     b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨  b^{284, 5}_0
c  in DIMACS:
 23309  23310  23311  1136  23312 0
 23309  23310  23311  1136 -23313 0
 23309  23310  23311  1136  23314 0

c  -1-1 --> -2
c    ( b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧  b^{284, 4}_0 ∧ -p_1136) -> ( b^{284, 5}_2 ∧  b^{284, 5}_1 ∧ -b^{284, 5}_0)
c  in CNF:
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨  b^{284, 5}_2
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨  b^{284, 5}_1
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨  p_1136 ∨ -b^{284, 5}_0
c  in DIMACS:
-23309  23310 -23311  1136  23312 0
-23309  23310 -23311  1136  23313 0
-23309  23310 -23311  1136 -23314 0

c  -2-1 --> break 
c    ( b^{284, 4}_2 ∧  b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧ -p_1136) -> break
c  in CNF:
c    -b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨  b^{284, 4}_0 ∨  p_1136 ∨ break
c  in DIMACS:
-23309 -23310  23311  1136 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{284, 4}_2 ∧ -b^{284, 4}_1 ∧ -b^{284, 4}_0 ∧ true) 
c  in CNF:
c    -b^{284, 4}_2 ∨  b^{284, 4}_1 ∨  b^{284, 4}_0 ∨ false 
c  in DIMACS:
-23309  23310  23311  0

c  3 does not represent an automaton state.
c    -(-b^{284, 4}_2 ∧  b^{284, 4}_1 ∧  b^{284, 4}_0 ∧ true) 
c  in CNF:
c     b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ false 
c  in DIMACS:
 23309 -23310 -23311  0
c  -3 does not represent an automaton state.
c    -( b^{284, 4}_2 ∧  b^{284, 4}_1 ∧  b^{284, 4}_0 ∧ true) 
c  in CNF:
c    -b^{284, 4}_2 ∨ -b^{284, 4}_1 ∨ -b^{284, 4}_0 ∨ false 
c  in DIMACS:
-23309 -23310 -23311  0

c INIT for k = 285
c    -b^{285, 1}_2
c    -b^{285, 1}_1
c    -b^{285, 1}_0
c  in DIMACS:
-23315 0
-23316 0
-23317 0

c Transitions for k = 285
c i = 1
c  -2+1 --> -1
c    ( b^{285, 1}_2 ∧  b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧  p_285) -> ( b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0)
c  in CNF:
c    -b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨  b^{285, 2}_2
c    -b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_1
c    -b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨  b^{285, 2}_0
c  in DIMACS:
-23315 -23316  23317 -285  23318 0
-23315 -23316  23317 -285 -23319 0
-23315 -23316  23317 -285  23320 0

c  -1+1 --> 0
c    ( b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧  b^{285, 1}_0 ∧  p_285) -> (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧ -b^{285, 2}_0)
c  in CNF:
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_2
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_1
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_0
c  in DIMACS:
-23315  23316 -23317 -285 -23318 0
-23315  23316 -23317 -285 -23319 0
-23315  23316 -23317 -285 -23320 0

c  0+1 --> 1
c    (-b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧  p_285) -> (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0)
c  in CNF:
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_2
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_1
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨  b^{285, 2}_0
c  in DIMACS:
 23315  23316  23317 -285 -23318 0
 23315  23316  23317 -285 -23319 0
 23315  23316  23317 -285  23320 0

c  1+1 --> 2
c    (-b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧  b^{285, 1}_0 ∧  p_285) -> (-b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0)
c  in CNF:
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_2
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨  b^{285, 2}_1
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ -p_285 ∨ -b^{285, 2}_0
c  in DIMACS:
 23315  23316 -23317 -285 -23318 0
 23315  23316 -23317 -285  23319 0
 23315  23316 -23317 -285 -23320 0

c  2+1 --> break 
c    (-b^{285, 1}_2 ∧  b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧  p_285) -> break
c  in CNF:
c     b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ -p_285 ∨ break
c  in DIMACS:
 23315 -23316  23317 -285 1162 0


c  2-1 --> 1
c    (-b^{285, 1}_2 ∧  b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧ -p_285) -> (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0)
c  in CNF:
c     b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_2
c     b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_1
c     b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨  b^{285, 2}_0
c  in DIMACS:
 23315 -23316  23317  285 -23318 0
 23315 -23316  23317  285 -23319 0
 23315 -23316  23317  285  23320 0

c  1-1 --> 0
c    (-b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧  b^{285, 1}_0 ∧ -p_285) -> (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧ -b^{285, 2}_0)
c  in CNF:
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_2
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_1
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_0
c  in DIMACS:
 23315  23316 -23317  285 -23318 0
 23315  23316 -23317  285 -23319 0
 23315  23316 -23317  285 -23320 0

c  0-1 --> -1
c    (-b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧ -p_285) -> ( b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0)
c  in CNF:
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨  b^{285, 2}_2
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_1
c     b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨  b^{285, 2}_0
c  in DIMACS:
 23315  23316  23317  285  23318 0
 23315  23316  23317  285 -23319 0
 23315  23316  23317  285  23320 0

c  -1-1 --> -2
c    ( b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧  b^{285, 1}_0 ∧ -p_285) -> ( b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0)
c  in CNF:
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨  b^{285, 2}_2
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨  b^{285, 2}_1
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨  p_285 ∨ -b^{285, 2}_0
c  in DIMACS:
-23315  23316 -23317  285  23318 0
-23315  23316 -23317  285  23319 0
-23315  23316 -23317  285 -23320 0

c  -2-1 --> break 
c    ( b^{285, 1}_2 ∧  b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧ -p_285) -> break
c  in CNF:
c    -b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨  b^{285, 1}_0 ∨  p_285 ∨ break
c  in DIMACS:
-23315 -23316  23317  285 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{285, 1}_2 ∧ -b^{285, 1}_1 ∧ -b^{285, 1}_0 ∧ true) 
c  in CNF:
c    -b^{285, 1}_2 ∨  b^{285, 1}_1 ∨  b^{285, 1}_0 ∨ false 
c  in DIMACS:
-23315  23316  23317  0

c  3 does not represent an automaton state.
c    -(-b^{285, 1}_2 ∧  b^{285, 1}_1 ∧  b^{285, 1}_0 ∧ true) 
c  in CNF:
c     b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ false 
c  in DIMACS:
 23315 -23316 -23317  0
c  -3 does not represent an automaton state.
c    -( b^{285, 1}_2 ∧  b^{285, 1}_1 ∧  b^{285, 1}_0 ∧ true) 
c  in CNF:
c    -b^{285, 1}_2 ∨ -b^{285, 1}_1 ∨ -b^{285, 1}_0 ∨ false 
c  in DIMACS:
-23315 -23316 -23317  0

c i = 2
c  -2+1 --> -1
c    ( b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧  p_570) -> ( b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0)
c  in CNF:
c    -b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨  b^{285, 3}_2
c    -b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_1
c    -b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨  b^{285, 3}_0
c  in DIMACS:
-23318 -23319  23320 -570  23321 0
-23318 -23319  23320 -570 -23322 0
-23318 -23319  23320 -570  23323 0

c  -1+1 --> 0
c    ( b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0 ∧  p_570) -> (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧ -b^{285, 3}_0)
c  in CNF:
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_2
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_1
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_0
c  in DIMACS:
-23318  23319 -23320 -570 -23321 0
-23318  23319 -23320 -570 -23322 0
-23318  23319 -23320 -570 -23323 0

c  0+1 --> 1
c    (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧  p_570) -> (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0)
c  in CNF:
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_2
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_1
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨  b^{285, 3}_0
c  in DIMACS:
 23318  23319  23320 -570 -23321 0
 23318  23319  23320 -570 -23322 0
 23318  23319  23320 -570  23323 0

c  1+1 --> 2
c    (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0 ∧  p_570) -> (-b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0)
c  in CNF:
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_2
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨  b^{285, 3}_1
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ -p_570 ∨ -b^{285, 3}_0
c  in DIMACS:
 23318  23319 -23320 -570 -23321 0
 23318  23319 -23320 -570  23322 0
 23318  23319 -23320 -570 -23323 0

c  2+1 --> break 
c    (-b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧  p_570) -> break
c  in CNF:
c     b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ -p_570 ∨ break
c  in DIMACS:
 23318 -23319  23320 -570 1162 0


c  2-1 --> 1
c    (-b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧ -p_570) -> (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0)
c  in CNF:
c     b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_2
c     b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_1
c     b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨  b^{285, 3}_0
c  in DIMACS:
 23318 -23319  23320  570 -23321 0
 23318 -23319  23320  570 -23322 0
 23318 -23319  23320  570  23323 0

c  1-1 --> 0
c    (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0 ∧ -p_570) -> (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧ -b^{285, 3}_0)
c  in CNF:
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_2
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_1
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_0
c  in DIMACS:
 23318  23319 -23320  570 -23321 0
 23318  23319 -23320  570 -23322 0
 23318  23319 -23320  570 -23323 0

c  0-1 --> -1
c    (-b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧ -p_570) -> ( b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0)
c  in CNF:
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨  b^{285, 3}_2
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_1
c     b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨  b^{285, 3}_0
c  in DIMACS:
 23318  23319  23320  570  23321 0
 23318  23319  23320  570 -23322 0
 23318  23319  23320  570  23323 0

c  -1-1 --> -2
c    ( b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧  b^{285, 2}_0 ∧ -p_570) -> ( b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0)
c  in CNF:
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨  b^{285, 3}_2
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨  b^{285, 3}_1
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨  p_570 ∨ -b^{285, 3}_0
c  in DIMACS:
-23318  23319 -23320  570  23321 0
-23318  23319 -23320  570  23322 0
-23318  23319 -23320  570 -23323 0

c  -2-1 --> break 
c    ( b^{285, 2}_2 ∧  b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧ -p_570) -> break
c  in CNF:
c    -b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨  b^{285, 2}_0 ∨  p_570 ∨ break
c  in DIMACS:
-23318 -23319  23320  570 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{285, 2}_2 ∧ -b^{285, 2}_1 ∧ -b^{285, 2}_0 ∧ true) 
c  in CNF:
c    -b^{285, 2}_2 ∨  b^{285, 2}_1 ∨  b^{285, 2}_0 ∨ false 
c  in DIMACS:
-23318  23319  23320  0

c  3 does not represent an automaton state.
c    -(-b^{285, 2}_2 ∧  b^{285, 2}_1 ∧  b^{285, 2}_0 ∧ true) 
c  in CNF:
c     b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ false 
c  in DIMACS:
 23318 -23319 -23320  0
c  -3 does not represent an automaton state.
c    -( b^{285, 2}_2 ∧  b^{285, 2}_1 ∧  b^{285, 2}_0 ∧ true) 
c  in CNF:
c    -b^{285, 2}_2 ∨ -b^{285, 2}_1 ∨ -b^{285, 2}_0 ∨ false 
c  in DIMACS:
-23318 -23319 -23320  0

c i = 3
c  -2+1 --> -1
c    ( b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧  p_855) -> ( b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0)
c  in CNF:
c    -b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨  b^{285, 4}_2
c    -b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_1
c    -b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨  b^{285, 4}_0
c  in DIMACS:
-23321 -23322  23323 -855  23324 0
-23321 -23322  23323 -855 -23325 0
-23321 -23322  23323 -855  23326 0

c  -1+1 --> 0
c    ( b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0 ∧  p_855) -> (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧ -b^{285, 4}_0)
c  in CNF:
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_2
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_1
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_0
c  in DIMACS:
-23321  23322 -23323 -855 -23324 0
-23321  23322 -23323 -855 -23325 0
-23321  23322 -23323 -855 -23326 0

c  0+1 --> 1
c    (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧  p_855) -> (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0)
c  in CNF:
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_2
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_1
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨  b^{285, 4}_0
c  in DIMACS:
 23321  23322  23323 -855 -23324 0
 23321  23322  23323 -855 -23325 0
 23321  23322  23323 -855  23326 0

c  1+1 --> 2
c    (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0 ∧  p_855) -> (-b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0)
c  in CNF:
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_2
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨  b^{285, 4}_1
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ -p_855 ∨ -b^{285, 4}_0
c  in DIMACS:
 23321  23322 -23323 -855 -23324 0
 23321  23322 -23323 -855  23325 0
 23321  23322 -23323 -855 -23326 0

c  2+1 --> break 
c    (-b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧  p_855) -> break
c  in CNF:
c     b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ -p_855 ∨ break
c  in DIMACS:
 23321 -23322  23323 -855 1162 0


c  2-1 --> 1
c    (-b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧ -p_855) -> (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0)
c  in CNF:
c     b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_2
c     b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_1
c     b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨  b^{285, 4}_0
c  in DIMACS:
 23321 -23322  23323  855 -23324 0
 23321 -23322  23323  855 -23325 0
 23321 -23322  23323  855  23326 0

c  1-1 --> 0
c    (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0 ∧ -p_855) -> (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧ -b^{285, 4}_0)
c  in CNF:
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_2
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_1
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_0
c  in DIMACS:
 23321  23322 -23323  855 -23324 0
 23321  23322 -23323  855 -23325 0
 23321  23322 -23323  855 -23326 0

c  0-1 --> -1
c    (-b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧ -p_855) -> ( b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0)
c  in CNF:
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨  b^{285, 4}_2
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_1
c     b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨  b^{285, 4}_0
c  in DIMACS:
 23321  23322  23323  855  23324 0
 23321  23322  23323  855 -23325 0
 23321  23322  23323  855  23326 0

c  -1-1 --> -2
c    ( b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧  b^{285, 3}_0 ∧ -p_855) -> ( b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0)
c  in CNF:
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨  b^{285, 4}_2
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨  b^{285, 4}_1
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨  p_855 ∨ -b^{285, 4}_0
c  in DIMACS:
-23321  23322 -23323  855  23324 0
-23321  23322 -23323  855  23325 0
-23321  23322 -23323  855 -23326 0

c  -2-1 --> break 
c    ( b^{285, 3}_2 ∧  b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧ -p_855) -> break
c  in CNF:
c    -b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨  b^{285, 3}_0 ∨  p_855 ∨ break
c  in DIMACS:
-23321 -23322  23323  855 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{285, 3}_2 ∧ -b^{285, 3}_1 ∧ -b^{285, 3}_0 ∧ true) 
c  in CNF:
c    -b^{285, 3}_2 ∨  b^{285, 3}_1 ∨  b^{285, 3}_0 ∨ false 
c  in DIMACS:
-23321  23322  23323  0

c  3 does not represent an automaton state.
c    -(-b^{285, 3}_2 ∧  b^{285, 3}_1 ∧  b^{285, 3}_0 ∧ true) 
c  in CNF:
c     b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ false 
c  in DIMACS:
 23321 -23322 -23323  0
c  -3 does not represent an automaton state.
c    -( b^{285, 3}_2 ∧  b^{285, 3}_1 ∧  b^{285, 3}_0 ∧ true) 
c  in CNF:
c    -b^{285, 3}_2 ∨ -b^{285, 3}_1 ∨ -b^{285, 3}_0 ∨ false 
c  in DIMACS:
-23321 -23322 -23323  0

c i = 4
c  -2+1 --> -1
c    ( b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧  p_1140) -> ( b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧  b^{285, 5}_0)
c  in CNF:
c    -b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨  b^{285, 5}_2
c    -b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_1
c    -b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨  b^{285, 5}_0
c  in DIMACS:
-23324 -23325  23326 -1140  23327 0
-23324 -23325  23326 -1140 -23328 0
-23324 -23325  23326 -1140  23329 0

c  -1+1 --> 0
c    ( b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0 ∧  p_1140) -> (-b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧ -b^{285, 5}_0)
c  in CNF:
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_2
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_1
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_0
c  in DIMACS:
-23324  23325 -23326 -1140 -23327 0
-23324  23325 -23326 -1140 -23328 0
-23324  23325 -23326 -1140 -23329 0

c  0+1 --> 1
c    (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧  p_1140) -> (-b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧  b^{285, 5}_0)
c  in CNF:
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_2
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_1
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨  b^{285, 5}_0
c  in DIMACS:
 23324  23325  23326 -1140 -23327 0
 23324  23325  23326 -1140 -23328 0
 23324  23325  23326 -1140  23329 0

c  1+1 --> 2
c    (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0 ∧  p_1140) -> (-b^{285, 5}_2 ∧  b^{285, 5}_1 ∧ -b^{285, 5}_0)
c  in CNF:
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_2
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨  b^{285, 5}_1
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ -p_1140 ∨ -b^{285, 5}_0
c  in DIMACS:
 23324  23325 -23326 -1140 -23327 0
 23324  23325 -23326 -1140  23328 0
 23324  23325 -23326 -1140 -23329 0

c  2+1 --> break 
c    (-b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 23324 -23325  23326 -1140 1162 0


c  2-1 --> 1
c    (-b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧ -p_1140) -> (-b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧  b^{285, 5}_0)
c  in CNF:
c     b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_2
c     b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_1
c     b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨  b^{285, 5}_0
c  in DIMACS:
 23324 -23325  23326  1140 -23327 0
 23324 -23325  23326  1140 -23328 0
 23324 -23325  23326  1140  23329 0

c  1-1 --> 0
c    (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0 ∧ -p_1140) -> (-b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧ -b^{285, 5}_0)
c  in CNF:
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_2
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_1
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_0
c  in DIMACS:
 23324  23325 -23326  1140 -23327 0
 23324  23325 -23326  1140 -23328 0
 23324  23325 -23326  1140 -23329 0

c  0-1 --> -1
c    (-b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧ -p_1140) -> ( b^{285, 5}_2 ∧ -b^{285, 5}_1 ∧  b^{285, 5}_0)
c  in CNF:
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨  b^{285, 5}_2
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_1
c     b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨  b^{285, 5}_0
c  in DIMACS:
 23324  23325  23326  1140  23327 0
 23324  23325  23326  1140 -23328 0
 23324  23325  23326  1140  23329 0

c  -1-1 --> -2
c    ( b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧  b^{285, 4}_0 ∧ -p_1140) -> ( b^{285, 5}_2 ∧  b^{285, 5}_1 ∧ -b^{285, 5}_0)
c  in CNF:
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨  b^{285, 5}_2
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨  b^{285, 5}_1
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨  p_1140 ∨ -b^{285, 5}_0
c  in DIMACS:
-23324  23325 -23326  1140  23327 0
-23324  23325 -23326  1140  23328 0
-23324  23325 -23326  1140 -23329 0

c  -2-1 --> break 
c    ( b^{285, 4}_2 ∧  b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨  b^{285, 4}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-23324 -23325  23326  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{285, 4}_2 ∧ -b^{285, 4}_1 ∧ -b^{285, 4}_0 ∧ true) 
c  in CNF:
c    -b^{285, 4}_2 ∨  b^{285, 4}_1 ∨  b^{285, 4}_0 ∨ false 
c  in DIMACS:
-23324  23325  23326  0

c  3 does not represent an automaton state.
c    -(-b^{285, 4}_2 ∧  b^{285, 4}_1 ∧  b^{285, 4}_0 ∧ true) 
c  in CNF:
c     b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ false 
c  in DIMACS:
 23324 -23325 -23326  0
c  -3 does not represent an automaton state.
c    -( b^{285, 4}_2 ∧  b^{285, 4}_1 ∧  b^{285, 4}_0 ∧ true) 
c  in CNF:
c    -b^{285, 4}_2 ∨ -b^{285, 4}_1 ∨ -b^{285, 4}_0 ∨ false 
c  in DIMACS:
-23324 -23325 -23326  0

c INIT for k = 286
c    -b^{286, 1}_2
c    -b^{286, 1}_1
c    -b^{286, 1}_0
c  in DIMACS:
-23330 0
-23331 0
-23332 0

c Transitions for k = 286
c i = 1
c  -2+1 --> -1
c    ( b^{286, 1}_2 ∧  b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧  p_286) -> ( b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0)
c  in CNF:
c    -b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨  b^{286, 2}_2
c    -b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_1
c    -b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨  b^{286, 2}_0
c  in DIMACS:
-23330 -23331  23332 -286  23333 0
-23330 -23331  23332 -286 -23334 0
-23330 -23331  23332 -286  23335 0

c  -1+1 --> 0
c    ( b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧  b^{286, 1}_0 ∧  p_286) -> (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧ -b^{286, 2}_0)
c  in CNF:
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_2
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_1
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_0
c  in DIMACS:
-23330  23331 -23332 -286 -23333 0
-23330  23331 -23332 -286 -23334 0
-23330  23331 -23332 -286 -23335 0

c  0+1 --> 1
c    (-b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧  p_286) -> (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0)
c  in CNF:
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_2
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_1
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨  b^{286, 2}_0
c  in DIMACS:
 23330  23331  23332 -286 -23333 0
 23330  23331  23332 -286 -23334 0
 23330  23331  23332 -286  23335 0

c  1+1 --> 2
c    (-b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧  b^{286, 1}_0 ∧  p_286) -> (-b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0)
c  in CNF:
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_2
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨  b^{286, 2}_1
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ -p_286 ∨ -b^{286, 2}_0
c  in DIMACS:
 23330  23331 -23332 -286 -23333 0
 23330  23331 -23332 -286  23334 0
 23330  23331 -23332 -286 -23335 0

c  2+1 --> break 
c    (-b^{286, 1}_2 ∧  b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧  p_286) -> break
c  in CNF:
c     b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ -p_286 ∨ break
c  in DIMACS:
 23330 -23331  23332 -286 1162 0


c  2-1 --> 1
c    (-b^{286, 1}_2 ∧  b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧ -p_286) -> (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0)
c  in CNF:
c     b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_2
c     b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_1
c     b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨  b^{286, 2}_0
c  in DIMACS:
 23330 -23331  23332  286 -23333 0
 23330 -23331  23332  286 -23334 0
 23330 -23331  23332  286  23335 0

c  1-1 --> 0
c    (-b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧  b^{286, 1}_0 ∧ -p_286) -> (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧ -b^{286, 2}_0)
c  in CNF:
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_2
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_1
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_0
c  in DIMACS:
 23330  23331 -23332  286 -23333 0
 23330  23331 -23332  286 -23334 0
 23330  23331 -23332  286 -23335 0

c  0-1 --> -1
c    (-b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧ -p_286) -> ( b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0)
c  in CNF:
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨  b^{286, 2}_2
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_1
c     b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨  b^{286, 2}_0
c  in DIMACS:
 23330  23331  23332  286  23333 0
 23330  23331  23332  286 -23334 0
 23330  23331  23332  286  23335 0

c  -1-1 --> -2
c    ( b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧  b^{286, 1}_0 ∧ -p_286) -> ( b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0)
c  in CNF:
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨  b^{286, 2}_2
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨  b^{286, 2}_1
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨  p_286 ∨ -b^{286, 2}_0
c  in DIMACS:
-23330  23331 -23332  286  23333 0
-23330  23331 -23332  286  23334 0
-23330  23331 -23332  286 -23335 0

c  -2-1 --> break 
c    ( b^{286, 1}_2 ∧  b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧ -p_286) -> break
c  in CNF:
c    -b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨  b^{286, 1}_0 ∨  p_286 ∨ break
c  in DIMACS:
-23330 -23331  23332  286 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{286, 1}_2 ∧ -b^{286, 1}_1 ∧ -b^{286, 1}_0 ∧ true) 
c  in CNF:
c    -b^{286, 1}_2 ∨  b^{286, 1}_1 ∨  b^{286, 1}_0 ∨ false 
c  in DIMACS:
-23330  23331  23332  0

c  3 does not represent an automaton state.
c    -(-b^{286, 1}_2 ∧  b^{286, 1}_1 ∧  b^{286, 1}_0 ∧ true) 
c  in CNF:
c     b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ false 
c  in DIMACS:
 23330 -23331 -23332  0
c  -3 does not represent an automaton state.
c    -( b^{286, 1}_2 ∧  b^{286, 1}_1 ∧  b^{286, 1}_0 ∧ true) 
c  in CNF:
c    -b^{286, 1}_2 ∨ -b^{286, 1}_1 ∨ -b^{286, 1}_0 ∨ false 
c  in DIMACS:
-23330 -23331 -23332  0

c i = 2
c  -2+1 --> -1
c    ( b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧  p_572) -> ( b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0)
c  in CNF:
c    -b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨  b^{286, 3}_2
c    -b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_1
c    -b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨  b^{286, 3}_0
c  in DIMACS:
-23333 -23334  23335 -572  23336 0
-23333 -23334  23335 -572 -23337 0
-23333 -23334  23335 -572  23338 0

c  -1+1 --> 0
c    ( b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0 ∧  p_572) -> (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧ -b^{286, 3}_0)
c  in CNF:
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_2
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_1
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_0
c  in DIMACS:
-23333  23334 -23335 -572 -23336 0
-23333  23334 -23335 -572 -23337 0
-23333  23334 -23335 -572 -23338 0

c  0+1 --> 1
c    (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧  p_572) -> (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0)
c  in CNF:
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_2
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_1
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨  b^{286, 3}_0
c  in DIMACS:
 23333  23334  23335 -572 -23336 0
 23333  23334  23335 -572 -23337 0
 23333  23334  23335 -572  23338 0

c  1+1 --> 2
c    (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0 ∧  p_572) -> (-b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0)
c  in CNF:
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_2
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨  b^{286, 3}_1
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ -p_572 ∨ -b^{286, 3}_0
c  in DIMACS:
 23333  23334 -23335 -572 -23336 0
 23333  23334 -23335 -572  23337 0
 23333  23334 -23335 -572 -23338 0

c  2+1 --> break 
c    (-b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧  p_572) -> break
c  in CNF:
c     b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ -p_572 ∨ break
c  in DIMACS:
 23333 -23334  23335 -572 1162 0


c  2-1 --> 1
c    (-b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧ -p_572) -> (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0)
c  in CNF:
c     b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_2
c     b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_1
c     b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨  b^{286, 3}_0
c  in DIMACS:
 23333 -23334  23335  572 -23336 0
 23333 -23334  23335  572 -23337 0
 23333 -23334  23335  572  23338 0

c  1-1 --> 0
c    (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0 ∧ -p_572) -> (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧ -b^{286, 3}_0)
c  in CNF:
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_2
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_1
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_0
c  in DIMACS:
 23333  23334 -23335  572 -23336 0
 23333  23334 -23335  572 -23337 0
 23333  23334 -23335  572 -23338 0

c  0-1 --> -1
c    (-b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧ -p_572) -> ( b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0)
c  in CNF:
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨  b^{286, 3}_2
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_1
c     b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨  b^{286, 3}_0
c  in DIMACS:
 23333  23334  23335  572  23336 0
 23333  23334  23335  572 -23337 0
 23333  23334  23335  572  23338 0

c  -1-1 --> -2
c    ( b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧  b^{286, 2}_0 ∧ -p_572) -> ( b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0)
c  in CNF:
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨  b^{286, 3}_2
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨  b^{286, 3}_1
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨  p_572 ∨ -b^{286, 3}_0
c  in DIMACS:
-23333  23334 -23335  572  23336 0
-23333  23334 -23335  572  23337 0
-23333  23334 -23335  572 -23338 0

c  -2-1 --> break 
c    ( b^{286, 2}_2 ∧  b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧ -p_572) -> break
c  in CNF:
c    -b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨  b^{286, 2}_0 ∨  p_572 ∨ break
c  in DIMACS:
-23333 -23334  23335  572 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{286, 2}_2 ∧ -b^{286, 2}_1 ∧ -b^{286, 2}_0 ∧ true) 
c  in CNF:
c    -b^{286, 2}_2 ∨  b^{286, 2}_1 ∨  b^{286, 2}_0 ∨ false 
c  in DIMACS:
-23333  23334  23335  0

c  3 does not represent an automaton state.
c    -(-b^{286, 2}_2 ∧  b^{286, 2}_1 ∧  b^{286, 2}_0 ∧ true) 
c  in CNF:
c     b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ false 
c  in DIMACS:
 23333 -23334 -23335  0
c  -3 does not represent an automaton state.
c    -( b^{286, 2}_2 ∧  b^{286, 2}_1 ∧  b^{286, 2}_0 ∧ true) 
c  in CNF:
c    -b^{286, 2}_2 ∨ -b^{286, 2}_1 ∨ -b^{286, 2}_0 ∨ false 
c  in DIMACS:
-23333 -23334 -23335  0

c i = 3
c  -2+1 --> -1
c    ( b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧  p_858) -> ( b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0)
c  in CNF:
c    -b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨  b^{286, 4}_2
c    -b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_1
c    -b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨  b^{286, 4}_0
c  in DIMACS:
-23336 -23337  23338 -858  23339 0
-23336 -23337  23338 -858 -23340 0
-23336 -23337  23338 -858  23341 0

c  -1+1 --> 0
c    ( b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0 ∧  p_858) -> (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧ -b^{286, 4}_0)
c  in CNF:
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_2
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_1
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_0
c  in DIMACS:
-23336  23337 -23338 -858 -23339 0
-23336  23337 -23338 -858 -23340 0
-23336  23337 -23338 -858 -23341 0

c  0+1 --> 1
c    (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧  p_858) -> (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0)
c  in CNF:
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_2
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_1
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨  b^{286, 4}_0
c  in DIMACS:
 23336  23337  23338 -858 -23339 0
 23336  23337  23338 -858 -23340 0
 23336  23337  23338 -858  23341 0

c  1+1 --> 2
c    (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0 ∧  p_858) -> (-b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0)
c  in CNF:
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_2
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨  b^{286, 4}_1
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ -p_858 ∨ -b^{286, 4}_0
c  in DIMACS:
 23336  23337 -23338 -858 -23339 0
 23336  23337 -23338 -858  23340 0
 23336  23337 -23338 -858 -23341 0

c  2+1 --> break 
c    (-b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧  p_858) -> break
c  in CNF:
c     b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ -p_858 ∨ break
c  in DIMACS:
 23336 -23337  23338 -858 1162 0


c  2-1 --> 1
c    (-b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧ -p_858) -> (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0)
c  in CNF:
c     b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_2
c     b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_1
c     b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨  b^{286, 4}_0
c  in DIMACS:
 23336 -23337  23338  858 -23339 0
 23336 -23337  23338  858 -23340 0
 23336 -23337  23338  858  23341 0

c  1-1 --> 0
c    (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0 ∧ -p_858) -> (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧ -b^{286, 4}_0)
c  in CNF:
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_2
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_1
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_0
c  in DIMACS:
 23336  23337 -23338  858 -23339 0
 23336  23337 -23338  858 -23340 0
 23336  23337 -23338  858 -23341 0

c  0-1 --> -1
c    (-b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧ -p_858) -> ( b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0)
c  in CNF:
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨  b^{286, 4}_2
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_1
c     b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨  b^{286, 4}_0
c  in DIMACS:
 23336  23337  23338  858  23339 0
 23336  23337  23338  858 -23340 0
 23336  23337  23338  858  23341 0

c  -1-1 --> -2
c    ( b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧  b^{286, 3}_0 ∧ -p_858) -> ( b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0)
c  in CNF:
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨  b^{286, 4}_2
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨  b^{286, 4}_1
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨  p_858 ∨ -b^{286, 4}_0
c  in DIMACS:
-23336  23337 -23338  858  23339 0
-23336  23337 -23338  858  23340 0
-23336  23337 -23338  858 -23341 0

c  -2-1 --> break 
c    ( b^{286, 3}_2 ∧  b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧ -p_858) -> break
c  in CNF:
c    -b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨  b^{286, 3}_0 ∨  p_858 ∨ break
c  in DIMACS:
-23336 -23337  23338  858 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{286, 3}_2 ∧ -b^{286, 3}_1 ∧ -b^{286, 3}_0 ∧ true) 
c  in CNF:
c    -b^{286, 3}_2 ∨  b^{286, 3}_1 ∨  b^{286, 3}_0 ∨ false 
c  in DIMACS:
-23336  23337  23338  0

c  3 does not represent an automaton state.
c    -(-b^{286, 3}_2 ∧  b^{286, 3}_1 ∧  b^{286, 3}_0 ∧ true) 
c  in CNF:
c     b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ false 
c  in DIMACS:
 23336 -23337 -23338  0
c  -3 does not represent an automaton state.
c    -( b^{286, 3}_2 ∧  b^{286, 3}_1 ∧  b^{286, 3}_0 ∧ true) 
c  in CNF:
c    -b^{286, 3}_2 ∨ -b^{286, 3}_1 ∨ -b^{286, 3}_0 ∨ false 
c  in DIMACS:
-23336 -23337 -23338  0

c i = 4
c  -2+1 --> -1
c    ( b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧  p_1144) -> ( b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧  b^{286, 5}_0)
c  in CNF:
c    -b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨  b^{286, 5}_2
c    -b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_1
c    -b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨  b^{286, 5}_0
c  in DIMACS:
-23339 -23340  23341 -1144  23342 0
-23339 -23340  23341 -1144 -23343 0
-23339 -23340  23341 -1144  23344 0

c  -1+1 --> 0
c    ( b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0 ∧  p_1144) -> (-b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧ -b^{286, 5}_0)
c  in CNF:
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_2
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_1
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_0
c  in DIMACS:
-23339  23340 -23341 -1144 -23342 0
-23339  23340 -23341 -1144 -23343 0
-23339  23340 -23341 -1144 -23344 0

c  0+1 --> 1
c    (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧  p_1144) -> (-b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧  b^{286, 5}_0)
c  in CNF:
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_2
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_1
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨  b^{286, 5}_0
c  in DIMACS:
 23339  23340  23341 -1144 -23342 0
 23339  23340  23341 -1144 -23343 0
 23339  23340  23341 -1144  23344 0

c  1+1 --> 2
c    (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0 ∧  p_1144) -> (-b^{286, 5}_2 ∧  b^{286, 5}_1 ∧ -b^{286, 5}_0)
c  in CNF:
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_2
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨  b^{286, 5}_1
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ -p_1144 ∨ -b^{286, 5}_0
c  in DIMACS:
 23339  23340 -23341 -1144 -23342 0
 23339  23340 -23341 -1144  23343 0
 23339  23340 -23341 -1144 -23344 0

c  2+1 --> break 
c    (-b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧  p_1144) -> break
c  in CNF:
c     b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ -p_1144 ∨ break
c  in DIMACS:
 23339 -23340  23341 -1144 1162 0


c  2-1 --> 1
c    (-b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧ -p_1144) -> (-b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧  b^{286, 5}_0)
c  in CNF:
c     b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_2
c     b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_1
c     b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨  b^{286, 5}_0
c  in DIMACS:
 23339 -23340  23341  1144 -23342 0
 23339 -23340  23341  1144 -23343 0
 23339 -23340  23341  1144  23344 0

c  1-1 --> 0
c    (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0 ∧ -p_1144) -> (-b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧ -b^{286, 5}_0)
c  in CNF:
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_2
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_1
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_0
c  in DIMACS:
 23339  23340 -23341  1144 -23342 0
 23339  23340 -23341  1144 -23343 0
 23339  23340 -23341  1144 -23344 0

c  0-1 --> -1
c    (-b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧ -p_1144) -> ( b^{286, 5}_2 ∧ -b^{286, 5}_1 ∧  b^{286, 5}_0)
c  in CNF:
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨  b^{286, 5}_2
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_1
c     b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨  b^{286, 5}_0
c  in DIMACS:
 23339  23340  23341  1144  23342 0
 23339  23340  23341  1144 -23343 0
 23339  23340  23341  1144  23344 0

c  -1-1 --> -2
c    ( b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧  b^{286, 4}_0 ∧ -p_1144) -> ( b^{286, 5}_2 ∧  b^{286, 5}_1 ∧ -b^{286, 5}_0)
c  in CNF:
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨  b^{286, 5}_2
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨  b^{286, 5}_1
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨  p_1144 ∨ -b^{286, 5}_0
c  in DIMACS:
-23339  23340 -23341  1144  23342 0
-23339  23340 -23341  1144  23343 0
-23339  23340 -23341  1144 -23344 0

c  -2-1 --> break 
c    ( b^{286, 4}_2 ∧  b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧ -p_1144) -> break
c  in CNF:
c    -b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨  b^{286, 4}_0 ∨  p_1144 ∨ break
c  in DIMACS:
-23339 -23340  23341  1144 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{286, 4}_2 ∧ -b^{286, 4}_1 ∧ -b^{286, 4}_0 ∧ true) 
c  in CNF:
c    -b^{286, 4}_2 ∨  b^{286, 4}_1 ∨  b^{286, 4}_0 ∨ false 
c  in DIMACS:
-23339  23340  23341  0

c  3 does not represent an automaton state.
c    -(-b^{286, 4}_2 ∧  b^{286, 4}_1 ∧  b^{286, 4}_0 ∧ true) 
c  in CNF:
c     b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ false 
c  in DIMACS:
 23339 -23340 -23341  0
c  -3 does not represent an automaton state.
c    -( b^{286, 4}_2 ∧  b^{286, 4}_1 ∧  b^{286, 4}_0 ∧ true) 
c  in CNF:
c    -b^{286, 4}_2 ∨ -b^{286, 4}_1 ∨ -b^{286, 4}_0 ∨ false 
c  in DIMACS:
-23339 -23340 -23341  0

c INIT for k = 287
c    -b^{287, 1}_2
c    -b^{287, 1}_1
c    -b^{287, 1}_0
c  in DIMACS:
-23345 0
-23346 0
-23347 0

c Transitions for k = 287
c i = 1
c  -2+1 --> -1
c    ( b^{287, 1}_2 ∧  b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧  p_287) -> ( b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0)
c  in CNF:
c    -b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨  b^{287, 2}_2
c    -b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_1
c    -b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨  b^{287, 2}_0
c  in DIMACS:
-23345 -23346  23347 -287  23348 0
-23345 -23346  23347 -287 -23349 0
-23345 -23346  23347 -287  23350 0

c  -1+1 --> 0
c    ( b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧  b^{287, 1}_0 ∧  p_287) -> (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧ -b^{287, 2}_0)
c  in CNF:
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_2
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_1
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_0
c  in DIMACS:
-23345  23346 -23347 -287 -23348 0
-23345  23346 -23347 -287 -23349 0
-23345  23346 -23347 -287 -23350 0

c  0+1 --> 1
c    (-b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧  p_287) -> (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0)
c  in CNF:
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_2
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_1
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨  b^{287, 2}_0
c  in DIMACS:
 23345  23346  23347 -287 -23348 0
 23345  23346  23347 -287 -23349 0
 23345  23346  23347 -287  23350 0

c  1+1 --> 2
c    (-b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧  b^{287, 1}_0 ∧  p_287) -> (-b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0)
c  in CNF:
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_2
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨  b^{287, 2}_1
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ -p_287 ∨ -b^{287, 2}_0
c  in DIMACS:
 23345  23346 -23347 -287 -23348 0
 23345  23346 -23347 -287  23349 0
 23345  23346 -23347 -287 -23350 0

c  2+1 --> break 
c    (-b^{287, 1}_2 ∧  b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧  p_287) -> break
c  in CNF:
c     b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ -p_287 ∨ break
c  in DIMACS:
 23345 -23346  23347 -287 1162 0


c  2-1 --> 1
c    (-b^{287, 1}_2 ∧  b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧ -p_287) -> (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0)
c  in CNF:
c     b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_2
c     b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_1
c     b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨  b^{287, 2}_0
c  in DIMACS:
 23345 -23346  23347  287 -23348 0
 23345 -23346  23347  287 -23349 0
 23345 -23346  23347  287  23350 0

c  1-1 --> 0
c    (-b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧  b^{287, 1}_0 ∧ -p_287) -> (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧ -b^{287, 2}_0)
c  in CNF:
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_2
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_1
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_0
c  in DIMACS:
 23345  23346 -23347  287 -23348 0
 23345  23346 -23347  287 -23349 0
 23345  23346 -23347  287 -23350 0

c  0-1 --> -1
c    (-b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧ -p_287) -> ( b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0)
c  in CNF:
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨  b^{287, 2}_2
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_1
c     b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨  b^{287, 2}_0
c  in DIMACS:
 23345  23346  23347  287  23348 0
 23345  23346  23347  287 -23349 0
 23345  23346  23347  287  23350 0

c  -1-1 --> -2
c    ( b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧  b^{287, 1}_0 ∧ -p_287) -> ( b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0)
c  in CNF:
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨  b^{287, 2}_2
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨  b^{287, 2}_1
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨  p_287 ∨ -b^{287, 2}_0
c  in DIMACS:
-23345  23346 -23347  287  23348 0
-23345  23346 -23347  287  23349 0
-23345  23346 -23347  287 -23350 0

c  -2-1 --> break 
c    ( b^{287, 1}_2 ∧  b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧ -p_287) -> break
c  in CNF:
c    -b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨  b^{287, 1}_0 ∨  p_287 ∨ break
c  in DIMACS:
-23345 -23346  23347  287 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{287, 1}_2 ∧ -b^{287, 1}_1 ∧ -b^{287, 1}_0 ∧ true) 
c  in CNF:
c    -b^{287, 1}_2 ∨  b^{287, 1}_1 ∨  b^{287, 1}_0 ∨ false 
c  in DIMACS:
-23345  23346  23347  0

c  3 does not represent an automaton state.
c    -(-b^{287, 1}_2 ∧  b^{287, 1}_1 ∧  b^{287, 1}_0 ∧ true) 
c  in CNF:
c     b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ false 
c  in DIMACS:
 23345 -23346 -23347  0
c  -3 does not represent an automaton state.
c    -( b^{287, 1}_2 ∧  b^{287, 1}_1 ∧  b^{287, 1}_0 ∧ true) 
c  in CNF:
c    -b^{287, 1}_2 ∨ -b^{287, 1}_1 ∨ -b^{287, 1}_0 ∨ false 
c  in DIMACS:
-23345 -23346 -23347  0

c i = 2
c  -2+1 --> -1
c    ( b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧  p_574) -> ( b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0)
c  in CNF:
c    -b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨  b^{287, 3}_2
c    -b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_1
c    -b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨  b^{287, 3}_0
c  in DIMACS:
-23348 -23349  23350 -574  23351 0
-23348 -23349  23350 -574 -23352 0
-23348 -23349  23350 -574  23353 0

c  -1+1 --> 0
c    ( b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0 ∧  p_574) -> (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧ -b^{287, 3}_0)
c  in CNF:
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_2
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_1
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_0
c  in DIMACS:
-23348  23349 -23350 -574 -23351 0
-23348  23349 -23350 -574 -23352 0
-23348  23349 -23350 -574 -23353 0

c  0+1 --> 1
c    (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧  p_574) -> (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0)
c  in CNF:
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_2
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_1
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨  b^{287, 3}_0
c  in DIMACS:
 23348  23349  23350 -574 -23351 0
 23348  23349  23350 -574 -23352 0
 23348  23349  23350 -574  23353 0

c  1+1 --> 2
c    (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0 ∧  p_574) -> (-b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0)
c  in CNF:
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_2
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨  b^{287, 3}_1
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ -p_574 ∨ -b^{287, 3}_0
c  in DIMACS:
 23348  23349 -23350 -574 -23351 0
 23348  23349 -23350 -574  23352 0
 23348  23349 -23350 -574 -23353 0

c  2+1 --> break 
c    (-b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧  p_574) -> break
c  in CNF:
c     b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ -p_574 ∨ break
c  in DIMACS:
 23348 -23349  23350 -574 1162 0


c  2-1 --> 1
c    (-b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧ -p_574) -> (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0)
c  in CNF:
c     b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_2
c     b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_1
c     b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨  b^{287, 3}_0
c  in DIMACS:
 23348 -23349  23350  574 -23351 0
 23348 -23349  23350  574 -23352 0
 23348 -23349  23350  574  23353 0

c  1-1 --> 0
c    (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0 ∧ -p_574) -> (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧ -b^{287, 3}_0)
c  in CNF:
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_2
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_1
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_0
c  in DIMACS:
 23348  23349 -23350  574 -23351 0
 23348  23349 -23350  574 -23352 0
 23348  23349 -23350  574 -23353 0

c  0-1 --> -1
c    (-b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧ -p_574) -> ( b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0)
c  in CNF:
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨  b^{287, 3}_2
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_1
c     b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨  b^{287, 3}_0
c  in DIMACS:
 23348  23349  23350  574  23351 0
 23348  23349  23350  574 -23352 0
 23348  23349  23350  574  23353 0

c  -1-1 --> -2
c    ( b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧  b^{287, 2}_0 ∧ -p_574) -> ( b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0)
c  in CNF:
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨  b^{287, 3}_2
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨  b^{287, 3}_1
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨  p_574 ∨ -b^{287, 3}_0
c  in DIMACS:
-23348  23349 -23350  574  23351 0
-23348  23349 -23350  574  23352 0
-23348  23349 -23350  574 -23353 0

c  -2-1 --> break 
c    ( b^{287, 2}_2 ∧  b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧ -p_574) -> break
c  in CNF:
c    -b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨  b^{287, 2}_0 ∨  p_574 ∨ break
c  in DIMACS:
-23348 -23349  23350  574 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{287, 2}_2 ∧ -b^{287, 2}_1 ∧ -b^{287, 2}_0 ∧ true) 
c  in CNF:
c    -b^{287, 2}_2 ∨  b^{287, 2}_1 ∨  b^{287, 2}_0 ∨ false 
c  in DIMACS:
-23348  23349  23350  0

c  3 does not represent an automaton state.
c    -(-b^{287, 2}_2 ∧  b^{287, 2}_1 ∧  b^{287, 2}_0 ∧ true) 
c  in CNF:
c     b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ false 
c  in DIMACS:
 23348 -23349 -23350  0
c  -3 does not represent an automaton state.
c    -( b^{287, 2}_2 ∧  b^{287, 2}_1 ∧  b^{287, 2}_0 ∧ true) 
c  in CNF:
c    -b^{287, 2}_2 ∨ -b^{287, 2}_1 ∨ -b^{287, 2}_0 ∨ false 
c  in DIMACS:
-23348 -23349 -23350  0

c i = 3
c  -2+1 --> -1
c    ( b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧  p_861) -> ( b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0)
c  in CNF:
c    -b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨  b^{287, 4}_2
c    -b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_1
c    -b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨  b^{287, 4}_0
c  in DIMACS:
-23351 -23352  23353 -861  23354 0
-23351 -23352  23353 -861 -23355 0
-23351 -23352  23353 -861  23356 0

c  -1+1 --> 0
c    ( b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0 ∧  p_861) -> (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧ -b^{287, 4}_0)
c  in CNF:
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_2
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_1
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_0
c  in DIMACS:
-23351  23352 -23353 -861 -23354 0
-23351  23352 -23353 -861 -23355 0
-23351  23352 -23353 -861 -23356 0

c  0+1 --> 1
c    (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧  p_861) -> (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0)
c  in CNF:
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_2
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_1
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨  b^{287, 4}_0
c  in DIMACS:
 23351  23352  23353 -861 -23354 0
 23351  23352  23353 -861 -23355 0
 23351  23352  23353 -861  23356 0

c  1+1 --> 2
c    (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0 ∧  p_861) -> (-b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0)
c  in CNF:
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_2
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨  b^{287, 4}_1
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ -p_861 ∨ -b^{287, 4}_0
c  in DIMACS:
 23351  23352 -23353 -861 -23354 0
 23351  23352 -23353 -861  23355 0
 23351  23352 -23353 -861 -23356 0

c  2+1 --> break 
c    (-b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧  p_861) -> break
c  in CNF:
c     b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ -p_861 ∨ break
c  in DIMACS:
 23351 -23352  23353 -861 1162 0


c  2-1 --> 1
c    (-b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧ -p_861) -> (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0)
c  in CNF:
c     b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_2
c     b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_1
c     b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨  b^{287, 4}_0
c  in DIMACS:
 23351 -23352  23353  861 -23354 0
 23351 -23352  23353  861 -23355 0
 23351 -23352  23353  861  23356 0

c  1-1 --> 0
c    (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0 ∧ -p_861) -> (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧ -b^{287, 4}_0)
c  in CNF:
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_2
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_1
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_0
c  in DIMACS:
 23351  23352 -23353  861 -23354 0
 23351  23352 -23353  861 -23355 0
 23351  23352 -23353  861 -23356 0

c  0-1 --> -1
c    (-b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧ -p_861) -> ( b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0)
c  in CNF:
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨  b^{287, 4}_2
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_1
c     b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨  b^{287, 4}_0
c  in DIMACS:
 23351  23352  23353  861  23354 0
 23351  23352  23353  861 -23355 0
 23351  23352  23353  861  23356 0

c  -1-1 --> -2
c    ( b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧  b^{287, 3}_0 ∧ -p_861) -> ( b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0)
c  in CNF:
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨  b^{287, 4}_2
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨  b^{287, 4}_1
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨  p_861 ∨ -b^{287, 4}_0
c  in DIMACS:
-23351  23352 -23353  861  23354 0
-23351  23352 -23353  861  23355 0
-23351  23352 -23353  861 -23356 0

c  -2-1 --> break 
c    ( b^{287, 3}_2 ∧  b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧ -p_861) -> break
c  in CNF:
c    -b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨  b^{287, 3}_0 ∨  p_861 ∨ break
c  in DIMACS:
-23351 -23352  23353  861 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{287, 3}_2 ∧ -b^{287, 3}_1 ∧ -b^{287, 3}_0 ∧ true) 
c  in CNF:
c    -b^{287, 3}_2 ∨  b^{287, 3}_1 ∨  b^{287, 3}_0 ∨ false 
c  in DIMACS:
-23351  23352  23353  0

c  3 does not represent an automaton state.
c    -(-b^{287, 3}_2 ∧  b^{287, 3}_1 ∧  b^{287, 3}_0 ∧ true) 
c  in CNF:
c     b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ false 
c  in DIMACS:
 23351 -23352 -23353  0
c  -3 does not represent an automaton state.
c    -( b^{287, 3}_2 ∧  b^{287, 3}_1 ∧  b^{287, 3}_0 ∧ true) 
c  in CNF:
c    -b^{287, 3}_2 ∨ -b^{287, 3}_1 ∨ -b^{287, 3}_0 ∨ false 
c  in DIMACS:
-23351 -23352 -23353  0

c i = 4
c  -2+1 --> -1
c    ( b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧  p_1148) -> ( b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧  b^{287, 5}_0)
c  in CNF:
c    -b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨  b^{287, 5}_2
c    -b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_1
c    -b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨  b^{287, 5}_0
c  in DIMACS:
-23354 -23355  23356 -1148  23357 0
-23354 -23355  23356 -1148 -23358 0
-23354 -23355  23356 -1148  23359 0

c  -1+1 --> 0
c    ( b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0 ∧  p_1148) -> (-b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧ -b^{287, 5}_0)
c  in CNF:
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_2
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_1
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_0
c  in DIMACS:
-23354  23355 -23356 -1148 -23357 0
-23354  23355 -23356 -1148 -23358 0
-23354  23355 -23356 -1148 -23359 0

c  0+1 --> 1
c    (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧  p_1148) -> (-b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧  b^{287, 5}_0)
c  in CNF:
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_2
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_1
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨  b^{287, 5}_0
c  in DIMACS:
 23354  23355  23356 -1148 -23357 0
 23354  23355  23356 -1148 -23358 0
 23354  23355  23356 -1148  23359 0

c  1+1 --> 2
c    (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0 ∧  p_1148) -> (-b^{287, 5}_2 ∧  b^{287, 5}_1 ∧ -b^{287, 5}_0)
c  in CNF:
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_2
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨  b^{287, 5}_1
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ -p_1148 ∨ -b^{287, 5}_0
c  in DIMACS:
 23354  23355 -23356 -1148 -23357 0
 23354  23355 -23356 -1148  23358 0
 23354  23355 -23356 -1148 -23359 0

c  2+1 --> break 
c    (-b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧  p_1148) -> break
c  in CNF:
c     b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ -p_1148 ∨ break
c  in DIMACS:
 23354 -23355  23356 -1148 1162 0


c  2-1 --> 1
c    (-b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧ -p_1148) -> (-b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧  b^{287, 5}_0)
c  in CNF:
c     b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_2
c     b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_1
c     b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨  b^{287, 5}_0
c  in DIMACS:
 23354 -23355  23356  1148 -23357 0
 23354 -23355  23356  1148 -23358 0
 23354 -23355  23356  1148  23359 0

c  1-1 --> 0
c    (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0 ∧ -p_1148) -> (-b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧ -b^{287, 5}_0)
c  in CNF:
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_2
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_1
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_0
c  in DIMACS:
 23354  23355 -23356  1148 -23357 0
 23354  23355 -23356  1148 -23358 0
 23354  23355 -23356  1148 -23359 0

c  0-1 --> -1
c    (-b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧ -p_1148) -> ( b^{287, 5}_2 ∧ -b^{287, 5}_1 ∧  b^{287, 5}_0)
c  in CNF:
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨  b^{287, 5}_2
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_1
c     b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨  b^{287, 5}_0
c  in DIMACS:
 23354  23355  23356  1148  23357 0
 23354  23355  23356  1148 -23358 0
 23354  23355  23356  1148  23359 0

c  -1-1 --> -2
c    ( b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧  b^{287, 4}_0 ∧ -p_1148) -> ( b^{287, 5}_2 ∧  b^{287, 5}_1 ∧ -b^{287, 5}_0)
c  in CNF:
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨  b^{287, 5}_2
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨  b^{287, 5}_1
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨  p_1148 ∨ -b^{287, 5}_0
c  in DIMACS:
-23354  23355 -23356  1148  23357 0
-23354  23355 -23356  1148  23358 0
-23354  23355 -23356  1148 -23359 0

c  -2-1 --> break 
c    ( b^{287, 4}_2 ∧  b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧ -p_1148) -> break
c  in CNF:
c    -b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨  b^{287, 4}_0 ∨  p_1148 ∨ break
c  in DIMACS:
-23354 -23355  23356  1148 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{287, 4}_2 ∧ -b^{287, 4}_1 ∧ -b^{287, 4}_0 ∧ true) 
c  in CNF:
c    -b^{287, 4}_2 ∨  b^{287, 4}_1 ∨  b^{287, 4}_0 ∨ false 
c  in DIMACS:
-23354  23355  23356  0

c  3 does not represent an automaton state.
c    -(-b^{287, 4}_2 ∧  b^{287, 4}_1 ∧  b^{287, 4}_0 ∧ true) 
c  in CNF:
c     b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ false 
c  in DIMACS:
 23354 -23355 -23356  0
c  -3 does not represent an automaton state.
c    -( b^{287, 4}_2 ∧  b^{287, 4}_1 ∧  b^{287, 4}_0 ∧ true) 
c  in CNF:
c    -b^{287, 4}_2 ∨ -b^{287, 4}_1 ∨ -b^{287, 4}_0 ∨ false 
c  in DIMACS:
-23354 -23355 -23356  0

c INIT for k = 288
c    -b^{288, 1}_2
c    -b^{288, 1}_1
c    -b^{288, 1}_0
c  in DIMACS:
-23360 0
-23361 0
-23362 0

c Transitions for k = 288
c i = 1
c  -2+1 --> -1
c    ( b^{288, 1}_2 ∧  b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧  p_288) -> ( b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0)
c  in CNF:
c    -b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨  b^{288, 2}_2
c    -b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_1
c    -b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨  b^{288, 2}_0
c  in DIMACS:
-23360 -23361  23362 -288  23363 0
-23360 -23361  23362 -288 -23364 0
-23360 -23361  23362 -288  23365 0

c  -1+1 --> 0
c    ( b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧  b^{288, 1}_0 ∧  p_288) -> (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧ -b^{288, 2}_0)
c  in CNF:
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_2
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_1
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_0
c  in DIMACS:
-23360  23361 -23362 -288 -23363 0
-23360  23361 -23362 -288 -23364 0
-23360  23361 -23362 -288 -23365 0

c  0+1 --> 1
c    (-b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧  p_288) -> (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0)
c  in CNF:
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_2
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_1
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨  b^{288, 2}_0
c  in DIMACS:
 23360  23361  23362 -288 -23363 0
 23360  23361  23362 -288 -23364 0
 23360  23361  23362 -288  23365 0

c  1+1 --> 2
c    (-b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧  b^{288, 1}_0 ∧  p_288) -> (-b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0)
c  in CNF:
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_2
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨  b^{288, 2}_1
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ -p_288 ∨ -b^{288, 2}_0
c  in DIMACS:
 23360  23361 -23362 -288 -23363 0
 23360  23361 -23362 -288  23364 0
 23360  23361 -23362 -288 -23365 0

c  2+1 --> break 
c    (-b^{288, 1}_2 ∧  b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧  p_288) -> break
c  in CNF:
c     b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ -p_288 ∨ break
c  in DIMACS:
 23360 -23361  23362 -288 1162 0


c  2-1 --> 1
c    (-b^{288, 1}_2 ∧  b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧ -p_288) -> (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0)
c  in CNF:
c     b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_2
c     b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_1
c     b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨  b^{288, 2}_0
c  in DIMACS:
 23360 -23361  23362  288 -23363 0
 23360 -23361  23362  288 -23364 0
 23360 -23361  23362  288  23365 0

c  1-1 --> 0
c    (-b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧  b^{288, 1}_0 ∧ -p_288) -> (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧ -b^{288, 2}_0)
c  in CNF:
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_2
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_1
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_0
c  in DIMACS:
 23360  23361 -23362  288 -23363 0
 23360  23361 -23362  288 -23364 0
 23360  23361 -23362  288 -23365 0

c  0-1 --> -1
c    (-b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧ -p_288) -> ( b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0)
c  in CNF:
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨  b^{288, 2}_2
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_1
c     b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨  b^{288, 2}_0
c  in DIMACS:
 23360  23361  23362  288  23363 0
 23360  23361  23362  288 -23364 0
 23360  23361  23362  288  23365 0

c  -1-1 --> -2
c    ( b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧  b^{288, 1}_0 ∧ -p_288) -> ( b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0)
c  in CNF:
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨  b^{288, 2}_2
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨  b^{288, 2}_1
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨  p_288 ∨ -b^{288, 2}_0
c  in DIMACS:
-23360  23361 -23362  288  23363 0
-23360  23361 -23362  288  23364 0
-23360  23361 -23362  288 -23365 0

c  -2-1 --> break 
c    ( b^{288, 1}_2 ∧  b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧ -p_288) -> break
c  in CNF:
c    -b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨  b^{288, 1}_0 ∨  p_288 ∨ break
c  in DIMACS:
-23360 -23361  23362  288 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{288, 1}_2 ∧ -b^{288, 1}_1 ∧ -b^{288, 1}_0 ∧ true) 
c  in CNF:
c    -b^{288, 1}_2 ∨  b^{288, 1}_1 ∨  b^{288, 1}_0 ∨ false 
c  in DIMACS:
-23360  23361  23362  0

c  3 does not represent an automaton state.
c    -(-b^{288, 1}_2 ∧  b^{288, 1}_1 ∧  b^{288, 1}_0 ∧ true) 
c  in CNF:
c     b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ false 
c  in DIMACS:
 23360 -23361 -23362  0
c  -3 does not represent an automaton state.
c    -( b^{288, 1}_2 ∧  b^{288, 1}_1 ∧  b^{288, 1}_0 ∧ true) 
c  in CNF:
c    -b^{288, 1}_2 ∨ -b^{288, 1}_1 ∨ -b^{288, 1}_0 ∨ false 
c  in DIMACS:
-23360 -23361 -23362  0

c i = 2
c  -2+1 --> -1
c    ( b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧  p_576) -> ( b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0)
c  in CNF:
c    -b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨  b^{288, 3}_2
c    -b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_1
c    -b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨  b^{288, 3}_0
c  in DIMACS:
-23363 -23364  23365 -576  23366 0
-23363 -23364  23365 -576 -23367 0
-23363 -23364  23365 -576  23368 0

c  -1+1 --> 0
c    ( b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0 ∧  p_576) -> (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧ -b^{288, 3}_0)
c  in CNF:
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_2
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_1
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_0
c  in DIMACS:
-23363  23364 -23365 -576 -23366 0
-23363  23364 -23365 -576 -23367 0
-23363  23364 -23365 -576 -23368 0

c  0+1 --> 1
c    (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧  p_576) -> (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0)
c  in CNF:
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_2
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_1
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨  b^{288, 3}_0
c  in DIMACS:
 23363  23364  23365 -576 -23366 0
 23363  23364  23365 -576 -23367 0
 23363  23364  23365 -576  23368 0

c  1+1 --> 2
c    (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0 ∧  p_576) -> (-b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0)
c  in CNF:
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_2
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨  b^{288, 3}_1
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ -p_576 ∨ -b^{288, 3}_0
c  in DIMACS:
 23363  23364 -23365 -576 -23366 0
 23363  23364 -23365 -576  23367 0
 23363  23364 -23365 -576 -23368 0

c  2+1 --> break 
c    (-b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧  p_576) -> break
c  in CNF:
c     b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ -p_576 ∨ break
c  in DIMACS:
 23363 -23364  23365 -576 1162 0


c  2-1 --> 1
c    (-b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧ -p_576) -> (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0)
c  in CNF:
c     b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_2
c     b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_1
c     b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨  b^{288, 3}_0
c  in DIMACS:
 23363 -23364  23365  576 -23366 0
 23363 -23364  23365  576 -23367 0
 23363 -23364  23365  576  23368 0

c  1-1 --> 0
c    (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0 ∧ -p_576) -> (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧ -b^{288, 3}_0)
c  in CNF:
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_2
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_1
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_0
c  in DIMACS:
 23363  23364 -23365  576 -23366 0
 23363  23364 -23365  576 -23367 0
 23363  23364 -23365  576 -23368 0

c  0-1 --> -1
c    (-b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧ -p_576) -> ( b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0)
c  in CNF:
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨  b^{288, 3}_2
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_1
c     b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨  b^{288, 3}_0
c  in DIMACS:
 23363  23364  23365  576  23366 0
 23363  23364  23365  576 -23367 0
 23363  23364  23365  576  23368 0

c  -1-1 --> -2
c    ( b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧  b^{288, 2}_0 ∧ -p_576) -> ( b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0)
c  in CNF:
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨  b^{288, 3}_2
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨  b^{288, 3}_1
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨  p_576 ∨ -b^{288, 3}_0
c  in DIMACS:
-23363  23364 -23365  576  23366 0
-23363  23364 -23365  576  23367 0
-23363  23364 -23365  576 -23368 0

c  -2-1 --> break 
c    ( b^{288, 2}_2 ∧  b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧ -p_576) -> break
c  in CNF:
c    -b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨  b^{288, 2}_0 ∨  p_576 ∨ break
c  in DIMACS:
-23363 -23364  23365  576 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{288, 2}_2 ∧ -b^{288, 2}_1 ∧ -b^{288, 2}_0 ∧ true) 
c  in CNF:
c    -b^{288, 2}_2 ∨  b^{288, 2}_1 ∨  b^{288, 2}_0 ∨ false 
c  in DIMACS:
-23363  23364  23365  0

c  3 does not represent an automaton state.
c    -(-b^{288, 2}_2 ∧  b^{288, 2}_1 ∧  b^{288, 2}_0 ∧ true) 
c  in CNF:
c     b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ false 
c  in DIMACS:
 23363 -23364 -23365  0
c  -3 does not represent an automaton state.
c    -( b^{288, 2}_2 ∧  b^{288, 2}_1 ∧  b^{288, 2}_0 ∧ true) 
c  in CNF:
c    -b^{288, 2}_2 ∨ -b^{288, 2}_1 ∨ -b^{288, 2}_0 ∨ false 
c  in DIMACS:
-23363 -23364 -23365  0

c i = 3
c  -2+1 --> -1
c    ( b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧  p_864) -> ( b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0)
c  in CNF:
c    -b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨  b^{288, 4}_2
c    -b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_1
c    -b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨  b^{288, 4}_0
c  in DIMACS:
-23366 -23367  23368 -864  23369 0
-23366 -23367  23368 -864 -23370 0
-23366 -23367  23368 -864  23371 0

c  -1+1 --> 0
c    ( b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0 ∧  p_864) -> (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧ -b^{288, 4}_0)
c  in CNF:
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_2
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_1
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_0
c  in DIMACS:
-23366  23367 -23368 -864 -23369 0
-23366  23367 -23368 -864 -23370 0
-23366  23367 -23368 -864 -23371 0

c  0+1 --> 1
c    (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧  p_864) -> (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0)
c  in CNF:
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_2
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_1
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨  b^{288, 4}_0
c  in DIMACS:
 23366  23367  23368 -864 -23369 0
 23366  23367  23368 -864 -23370 0
 23366  23367  23368 -864  23371 0

c  1+1 --> 2
c    (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0 ∧  p_864) -> (-b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0)
c  in CNF:
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_2
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨  b^{288, 4}_1
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ -p_864 ∨ -b^{288, 4}_0
c  in DIMACS:
 23366  23367 -23368 -864 -23369 0
 23366  23367 -23368 -864  23370 0
 23366  23367 -23368 -864 -23371 0

c  2+1 --> break 
c    (-b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧  p_864) -> break
c  in CNF:
c     b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ -p_864 ∨ break
c  in DIMACS:
 23366 -23367  23368 -864 1162 0


c  2-1 --> 1
c    (-b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧ -p_864) -> (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0)
c  in CNF:
c     b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_2
c     b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_1
c     b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨  b^{288, 4}_0
c  in DIMACS:
 23366 -23367  23368  864 -23369 0
 23366 -23367  23368  864 -23370 0
 23366 -23367  23368  864  23371 0

c  1-1 --> 0
c    (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0 ∧ -p_864) -> (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧ -b^{288, 4}_0)
c  in CNF:
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_2
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_1
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_0
c  in DIMACS:
 23366  23367 -23368  864 -23369 0
 23366  23367 -23368  864 -23370 0
 23366  23367 -23368  864 -23371 0

c  0-1 --> -1
c    (-b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧ -p_864) -> ( b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0)
c  in CNF:
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨  b^{288, 4}_2
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_1
c     b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨  b^{288, 4}_0
c  in DIMACS:
 23366  23367  23368  864  23369 0
 23366  23367  23368  864 -23370 0
 23366  23367  23368  864  23371 0

c  -1-1 --> -2
c    ( b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧  b^{288, 3}_0 ∧ -p_864) -> ( b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0)
c  in CNF:
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨  b^{288, 4}_2
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨  b^{288, 4}_1
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨  p_864 ∨ -b^{288, 4}_0
c  in DIMACS:
-23366  23367 -23368  864  23369 0
-23366  23367 -23368  864  23370 0
-23366  23367 -23368  864 -23371 0

c  -2-1 --> break 
c    ( b^{288, 3}_2 ∧  b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧ -p_864) -> break
c  in CNF:
c    -b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨  b^{288, 3}_0 ∨  p_864 ∨ break
c  in DIMACS:
-23366 -23367  23368  864 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{288, 3}_2 ∧ -b^{288, 3}_1 ∧ -b^{288, 3}_0 ∧ true) 
c  in CNF:
c    -b^{288, 3}_2 ∨  b^{288, 3}_1 ∨  b^{288, 3}_0 ∨ false 
c  in DIMACS:
-23366  23367  23368  0

c  3 does not represent an automaton state.
c    -(-b^{288, 3}_2 ∧  b^{288, 3}_1 ∧  b^{288, 3}_0 ∧ true) 
c  in CNF:
c     b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ false 
c  in DIMACS:
 23366 -23367 -23368  0
c  -3 does not represent an automaton state.
c    -( b^{288, 3}_2 ∧  b^{288, 3}_1 ∧  b^{288, 3}_0 ∧ true) 
c  in CNF:
c    -b^{288, 3}_2 ∨ -b^{288, 3}_1 ∨ -b^{288, 3}_0 ∨ false 
c  in DIMACS:
-23366 -23367 -23368  0

c i = 4
c  -2+1 --> -1
c    ( b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧  p_1152) -> ( b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧  b^{288, 5}_0)
c  in CNF:
c    -b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨  b^{288, 5}_2
c    -b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_1
c    -b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨  b^{288, 5}_0
c  in DIMACS:
-23369 -23370  23371 -1152  23372 0
-23369 -23370  23371 -1152 -23373 0
-23369 -23370  23371 -1152  23374 0

c  -1+1 --> 0
c    ( b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0 ∧  p_1152) -> (-b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧ -b^{288, 5}_0)
c  in CNF:
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_2
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_1
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_0
c  in DIMACS:
-23369  23370 -23371 -1152 -23372 0
-23369  23370 -23371 -1152 -23373 0
-23369  23370 -23371 -1152 -23374 0

c  0+1 --> 1
c    (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧  p_1152) -> (-b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧  b^{288, 5}_0)
c  in CNF:
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_2
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_1
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨  b^{288, 5}_0
c  in DIMACS:
 23369  23370  23371 -1152 -23372 0
 23369  23370  23371 -1152 -23373 0
 23369  23370  23371 -1152  23374 0

c  1+1 --> 2
c    (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0 ∧  p_1152) -> (-b^{288, 5}_2 ∧  b^{288, 5}_1 ∧ -b^{288, 5}_0)
c  in CNF:
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_2
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨  b^{288, 5}_1
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ -p_1152 ∨ -b^{288, 5}_0
c  in DIMACS:
 23369  23370 -23371 -1152 -23372 0
 23369  23370 -23371 -1152  23373 0
 23369  23370 -23371 -1152 -23374 0

c  2+1 --> break 
c    (-b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 23369 -23370  23371 -1152 1162 0


c  2-1 --> 1
c    (-b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧ -p_1152) -> (-b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧  b^{288, 5}_0)
c  in CNF:
c     b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_2
c     b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_1
c     b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨  b^{288, 5}_0
c  in DIMACS:
 23369 -23370  23371  1152 -23372 0
 23369 -23370  23371  1152 -23373 0
 23369 -23370  23371  1152  23374 0

c  1-1 --> 0
c    (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0 ∧ -p_1152) -> (-b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧ -b^{288, 5}_0)
c  in CNF:
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_2
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_1
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_0
c  in DIMACS:
 23369  23370 -23371  1152 -23372 0
 23369  23370 -23371  1152 -23373 0
 23369  23370 -23371  1152 -23374 0

c  0-1 --> -1
c    (-b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧ -p_1152) -> ( b^{288, 5}_2 ∧ -b^{288, 5}_1 ∧  b^{288, 5}_0)
c  in CNF:
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨  b^{288, 5}_2
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_1
c     b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨  b^{288, 5}_0
c  in DIMACS:
 23369  23370  23371  1152  23372 0
 23369  23370  23371  1152 -23373 0
 23369  23370  23371  1152  23374 0

c  -1-1 --> -2
c    ( b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧  b^{288, 4}_0 ∧ -p_1152) -> ( b^{288, 5}_2 ∧  b^{288, 5}_1 ∧ -b^{288, 5}_0)
c  in CNF:
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨  b^{288, 5}_2
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨  b^{288, 5}_1
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨  p_1152 ∨ -b^{288, 5}_0
c  in DIMACS:
-23369  23370 -23371  1152  23372 0
-23369  23370 -23371  1152  23373 0
-23369  23370 -23371  1152 -23374 0

c  -2-1 --> break 
c    ( b^{288, 4}_2 ∧  b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨  b^{288, 4}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-23369 -23370  23371  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{288, 4}_2 ∧ -b^{288, 4}_1 ∧ -b^{288, 4}_0 ∧ true) 
c  in CNF:
c    -b^{288, 4}_2 ∨  b^{288, 4}_1 ∨  b^{288, 4}_0 ∨ false 
c  in DIMACS:
-23369  23370  23371  0

c  3 does not represent an automaton state.
c    -(-b^{288, 4}_2 ∧  b^{288, 4}_1 ∧  b^{288, 4}_0 ∧ true) 
c  in CNF:
c     b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ false 
c  in DIMACS:
 23369 -23370 -23371  0
c  -3 does not represent an automaton state.
c    -( b^{288, 4}_2 ∧  b^{288, 4}_1 ∧  b^{288, 4}_0 ∧ true) 
c  in CNF:
c    -b^{288, 4}_2 ∨ -b^{288, 4}_1 ∨ -b^{288, 4}_0 ∨ false 
c  in DIMACS:
-23369 -23370 -23371  0

c INIT for k = 289
c    -b^{289, 1}_2
c    -b^{289, 1}_1
c    -b^{289, 1}_0
c  in DIMACS:
-23375 0
-23376 0
-23377 0

c Transitions for k = 289
c i = 1
c  -2+1 --> -1
c    ( b^{289, 1}_2 ∧  b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧  p_289) -> ( b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0)
c  in CNF:
c    -b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨  b^{289, 2}_2
c    -b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_1
c    -b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨  b^{289, 2}_0
c  in DIMACS:
-23375 -23376  23377 -289  23378 0
-23375 -23376  23377 -289 -23379 0
-23375 -23376  23377 -289  23380 0

c  -1+1 --> 0
c    ( b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧  b^{289, 1}_0 ∧  p_289) -> (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧ -b^{289, 2}_0)
c  in CNF:
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_2
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_1
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_0
c  in DIMACS:
-23375  23376 -23377 -289 -23378 0
-23375  23376 -23377 -289 -23379 0
-23375  23376 -23377 -289 -23380 0

c  0+1 --> 1
c    (-b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧  p_289) -> (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0)
c  in CNF:
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_2
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_1
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨  b^{289, 2}_0
c  in DIMACS:
 23375  23376  23377 -289 -23378 0
 23375  23376  23377 -289 -23379 0
 23375  23376  23377 -289  23380 0

c  1+1 --> 2
c    (-b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧  b^{289, 1}_0 ∧  p_289) -> (-b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0)
c  in CNF:
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_2
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨  b^{289, 2}_1
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ -p_289 ∨ -b^{289, 2}_0
c  in DIMACS:
 23375  23376 -23377 -289 -23378 0
 23375  23376 -23377 -289  23379 0
 23375  23376 -23377 -289 -23380 0

c  2+1 --> break 
c    (-b^{289, 1}_2 ∧  b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧  p_289) -> break
c  in CNF:
c     b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ -p_289 ∨ break
c  in DIMACS:
 23375 -23376  23377 -289 1162 0


c  2-1 --> 1
c    (-b^{289, 1}_2 ∧  b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧ -p_289) -> (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0)
c  in CNF:
c     b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_2
c     b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_1
c     b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨  b^{289, 2}_0
c  in DIMACS:
 23375 -23376  23377  289 -23378 0
 23375 -23376  23377  289 -23379 0
 23375 -23376  23377  289  23380 0

c  1-1 --> 0
c    (-b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧  b^{289, 1}_0 ∧ -p_289) -> (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧ -b^{289, 2}_0)
c  in CNF:
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_2
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_1
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_0
c  in DIMACS:
 23375  23376 -23377  289 -23378 0
 23375  23376 -23377  289 -23379 0
 23375  23376 -23377  289 -23380 0

c  0-1 --> -1
c    (-b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧ -p_289) -> ( b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0)
c  in CNF:
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨  b^{289, 2}_2
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_1
c     b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨  b^{289, 2}_0
c  in DIMACS:
 23375  23376  23377  289  23378 0
 23375  23376  23377  289 -23379 0
 23375  23376  23377  289  23380 0

c  -1-1 --> -2
c    ( b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧  b^{289, 1}_0 ∧ -p_289) -> ( b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0)
c  in CNF:
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨  b^{289, 2}_2
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨  b^{289, 2}_1
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨  p_289 ∨ -b^{289, 2}_0
c  in DIMACS:
-23375  23376 -23377  289  23378 0
-23375  23376 -23377  289  23379 0
-23375  23376 -23377  289 -23380 0

c  -2-1 --> break 
c    ( b^{289, 1}_2 ∧  b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧ -p_289) -> break
c  in CNF:
c    -b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨  b^{289, 1}_0 ∨  p_289 ∨ break
c  in DIMACS:
-23375 -23376  23377  289 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{289, 1}_2 ∧ -b^{289, 1}_1 ∧ -b^{289, 1}_0 ∧ true) 
c  in CNF:
c    -b^{289, 1}_2 ∨  b^{289, 1}_1 ∨  b^{289, 1}_0 ∨ false 
c  in DIMACS:
-23375  23376  23377  0

c  3 does not represent an automaton state.
c    -(-b^{289, 1}_2 ∧  b^{289, 1}_1 ∧  b^{289, 1}_0 ∧ true) 
c  in CNF:
c     b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ false 
c  in DIMACS:
 23375 -23376 -23377  0
c  -3 does not represent an automaton state.
c    -( b^{289, 1}_2 ∧  b^{289, 1}_1 ∧  b^{289, 1}_0 ∧ true) 
c  in CNF:
c    -b^{289, 1}_2 ∨ -b^{289, 1}_1 ∨ -b^{289, 1}_0 ∨ false 
c  in DIMACS:
-23375 -23376 -23377  0

c i = 2
c  -2+1 --> -1
c    ( b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧  p_578) -> ( b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0)
c  in CNF:
c    -b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨  b^{289, 3}_2
c    -b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_1
c    -b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨  b^{289, 3}_0
c  in DIMACS:
-23378 -23379  23380 -578  23381 0
-23378 -23379  23380 -578 -23382 0
-23378 -23379  23380 -578  23383 0

c  -1+1 --> 0
c    ( b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0 ∧  p_578) -> (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧ -b^{289, 3}_0)
c  in CNF:
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_2
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_1
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_0
c  in DIMACS:
-23378  23379 -23380 -578 -23381 0
-23378  23379 -23380 -578 -23382 0
-23378  23379 -23380 -578 -23383 0

c  0+1 --> 1
c    (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧  p_578) -> (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0)
c  in CNF:
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_2
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_1
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨  b^{289, 3}_0
c  in DIMACS:
 23378  23379  23380 -578 -23381 0
 23378  23379  23380 -578 -23382 0
 23378  23379  23380 -578  23383 0

c  1+1 --> 2
c    (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0 ∧  p_578) -> (-b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0)
c  in CNF:
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_2
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨  b^{289, 3}_1
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ -p_578 ∨ -b^{289, 3}_0
c  in DIMACS:
 23378  23379 -23380 -578 -23381 0
 23378  23379 -23380 -578  23382 0
 23378  23379 -23380 -578 -23383 0

c  2+1 --> break 
c    (-b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧  p_578) -> break
c  in CNF:
c     b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ -p_578 ∨ break
c  in DIMACS:
 23378 -23379  23380 -578 1162 0


c  2-1 --> 1
c    (-b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧ -p_578) -> (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0)
c  in CNF:
c     b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_2
c     b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_1
c     b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨  b^{289, 3}_0
c  in DIMACS:
 23378 -23379  23380  578 -23381 0
 23378 -23379  23380  578 -23382 0
 23378 -23379  23380  578  23383 0

c  1-1 --> 0
c    (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0 ∧ -p_578) -> (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧ -b^{289, 3}_0)
c  in CNF:
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_2
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_1
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_0
c  in DIMACS:
 23378  23379 -23380  578 -23381 0
 23378  23379 -23380  578 -23382 0
 23378  23379 -23380  578 -23383 0

c  0-1 --> -1
c    (-b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧ -p_578) -> ( b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0)
c  in CNF:
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨  b^{289, 3}_2
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_1
c     b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨  b^{289, 3}_0
c  in DIMACS:
 23378  23379  23380  578  23381 0
 23378  23379  23380  578 -23382 0
 23378  23379  23380  578  23383 0

c  -1-1 --> -2
c    ( b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧  b^{289, 2}_0 ∧ -p_578) -> ( b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0)
c  in CNF:
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨  b^{289, 3}_2
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨  b^{289, 3}_1
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨  p_578 ∨ -b^{289, 3}_0
c  in DIMACS:
-23378  23379 -23380  578  23381 0
-23378  23379 -23380  578  23382 0
-23378  23379 -23380  578 -23383 0

c  -2-1 --> break 
c    ( b^{289, 2}_2 ∧  b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧ -p_578) -> break
c  in CNF:
c    -b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨  b^{289, 2}_0 ∨  p_578 ∨ break
c  in DIMACS:
-23378 -23379  23380  578 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{289, 2}_2 ∧ -b^{289, 2}_1 ∧ -b^{289, 2}_0 ∧ true) 
c  in CNF:
c    -b^{289, 2}_2 ∨  b^{289, 2}_1 ∨  b^{289, 2}_0 ∨ false 
c  in DIMACS:
-23378  23379  23380  0

c  3 does not represent an automaton state.
c    -(-b^{289, 2}_2 ∧  b^{289, 2}_1 ∧  b^{289, 2}_0 ∧ true) 
c  in CNF:
c     b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ false 
c  in DIMACS:
 23378 -23379 -23380  0
c  -3 does not represent an automaton state.
c    -( b^{289, 2}_2 ∧  b^{289, 2}_1 ∧  b^{289, 2}_0 ∧ true) 
c  in CNF:
c    -b^{289, 2}_2 ∨ -b^{289, 2}_1 ∨ -b^{289, 2}_0 ∨ false 
c  in DIMACS:
-23378 -23379 -23380  0

c i = 3
c  -2+1 --> -1
c    ( b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧  p_867) -> ( b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0)
c  in CNF:
c    -b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨  b^{289, 4}_2
c    -b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_1
c    -b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨  b^{289, 4}_0
c  in DIMACS:
-23381 -23382  23383 -867  23384 0
-23381 -23382  23383 -867 -23385 0
-23381 -23382  23383 -867  23386 0

c  -1+1 --> 0
c    ( b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0 ∧  p_867) -> (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧ -b^{289, 4}_0)
c  in CNF:
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_2
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_1
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_0
c  in DIMACS:
-23381  23382 -23383 -867 -23384 0
-23381  23382 -23383 -867 -23385 0
-23381  23382 -23383 -867 -23386 0

c  0+1 --> 1
c    (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧  p_867) -> (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0)
c  in CNF:
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_2
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_1
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨  b^{289, 4}_0
c  in DIMACS:
 23381  23382  23383 -867 -23384 0
 23381  23382  23383 -867 -23385 0
 23381  23382  23383 -867  23386 0

c  1+1 --> 2
c    (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0 ∧  p_867) -> (-b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0)
c  in CNF:
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_2
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨  b^{289, 4}_1
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ -p_867 ∨ -b^{289, 4}_0
c  in DIMACS:
 23381  23382 -23383 -867 -23384 0
 23381  23382 -23383 -867  23385 0
 23381  23382 -23383 -867 -23386 0

c  2+1 --> break 
c    (-b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧  p_867) -> break
c  in CNF:
c     b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ -p_867 ∨ break
c  in DIMACS:
 23381 -23382  23383 -867 1162 0


c  2-1 --> 1
c    (-b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧ -p_867) -> (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0)
c  in CNF:
c     b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_2
c     b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_1
c     b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨  b^{289, 4}_0
c  in DIMACS:
 23381 -23382  23383  867 -23384 0
 23381 -23382  23383  867 -23385 0
 23381 -23382  23383  867  23386 0

c  1-1 --> 0
c    (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0 ∧ -p_867) -> (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧ -b^{289, 4}_0)
c  in CNF:
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_2
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_1
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_0
c  in DIMACS:
 23381  23382 -23383  867 -23384 0
 23381  23382 -23383  867 -23385 0
 23381  23382 -23383  867 -23386 0

c  0-1 --> -1
c    (-b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧ -p_867) -> ( b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0)
c  in CNF:
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨  b^{289, 4}_2
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_1
c     b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨  b^{289, 4}_0
c  in DIMACS:
 23381  23382  23383  867  23384 0
 23381  23382  23383  867 -23385 0
 23381  23382  23383  867  23386 0

c  -1-1 --> -2
c    ( b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧  b^{289, 3}_0 ∧ -p_867) -> ( b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0)
c  in CNF:
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨  b^{289, 4}_2
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨  b^{289, 4}_1
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨  p_867 ∨ -b^{289, 4}_0
c  in DIMACS:
-23381  23382 -23383  867  23384 0
-23381  23382 -23383  867  23385 0
-23381  23382 -23383  867 -23386 0

c  -2-1 --> break 
c    ( b^{289, 3}_2 ∧  b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧ -p_867) -> break
c  in CNF:
c    -b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨  b^{289, 3}_0 ∨  p_867 ∨ break
c  in DIMACS:
-23381 -23382  23383  867 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{289, 3}_2 ∧ -b^{289, 3}_1 ∧ -b^{289, 3}_0 ∧ true) 
c  in CNF:
c    -b^{289, 3}_2 ∨  b^{289, 3}_1 ∨  b^{289, 3}_0 ∨ false 
c  in DIMACS:
-23381  23382  23383  0

c  3 does not represent an automaton state.
c    -(-b^{289, 3}_2 ∧  b^{289, 3}_1 ∧  b^{289, 3}_0 ∧ true) 
c  in CNF:
c     b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ false 
c  in DIMACS:
 23381 -23382 -23383  0
c  -3 does not represent an automaton state.
c    -( b^{289, 3}_2 ∧  b^{289, 3}_1 ∧  b^{289, 3}_0 ∧ true) 
c  in CNF:
c    -b^{289, 3}_2 ∨ -b^{289, 3}_1 ∨ -b^{289, 3}_0 ∨ false 
c  in DIMACS:
-23381 -23382 -23383  0

c i = 4
c  -2+1 --> -1
c    ( b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧  p_1156) -> ( b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧  b^{289, 5}_0)
c  in CNF:
c    -b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨  b^{289, 5}_2
c    -b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_1
c    -b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨  b^{289, 5}_0
c  in DIMACS:
-23384 -23385  23386 -1156  23387 0
-23384 -23385  23386 -1156 -23388 0
-23384 -23385  23386 -1156  23389 0

c  -1+1 --> 0
c    ( b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0 ∧  p_1156) -> (-b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧ -b^{289, 5}_0)
c  in CNF:
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_2
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_1
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_0
c  in DIMACS:
-23384  23385 -23386 -1156 -23387 0
-23384  23385 -23386 -1156 -23388 0
-23384  23385 -23386 -1156 -23389 0

c  0+1 --> 1
c    (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧  p_1156) -> (-b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧  b^{289, 5}_0)
c  in CNF:
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_2
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_1
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨  b^{289, 5}_0
c  in DIMACS:
 23384  23385  23386 -1156 -23387 0
 23384  23385  23386 -1156 -23388 0
 23384  23385  23386 -1156  23389 0

c  1+1 --> 2
c    (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0 ∧  p_1156) -> (-b^{289, 5}_2 ∧  b^{289, 5}_1 ∧ -b^{289, 5}_0)
c  in CNF:
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_2
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨  b^{289, 5}_1
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ -p_1156 ∨ -b^{289, 5}_0
c  in DIMACS:
 23384  23385 -23386 -1156 -23387 0
 23384  23385 -23386 -1156  23388 0
 23384  23385 -23386 -1156 -23389 0

c  2+1 --> break 
c    (-b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧  p_1156) -> break
c  in CNF:
c     b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ -p_1156 ∨ break
c  in DIMACS:
 23384 -23385  23386 -1156 1162 0


c  2-1 --> 1
c    (-b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧ -p_1156) -> (-b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧  b^{289, 5}_0)
c  in CNF:
c     b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_2
c     b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_1
c     b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨  b^{289, 5}_0
c  in DIMACS:
 23384 -23385  23386  1156 -23387 0
 23384 -23385  23386  1156 -23388 0
 23384 -23385  23386  1156  23389 0

c  1-1 --> 0
c    (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0 ∧ -p_1156) -> (-b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧ -b^{289, 5}_0)
c  in CNF:
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_2
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_1
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_0
c  in DIMACS:
 23384  23385 -23386  1156 -23387 0
 23384  23385 -23386  1156 -23388 0
 23384  23385 -23386  1156 -23389 0

c  0-1 --> -1
c    (-b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧ -p_1156) -> ( b^{289, 5}_2 ∧ -b^{289, 5}_1 ∧  b^{289, 5}_0)
c  in CNF:
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨  b^{289, 5}_2
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_1
c     b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨  b^{289, 5}_0
c  in DIMACS:
 23384  23385  23386  1156  23387 0
 23384  23385  23386  1156 -23388 0
 23384  23385  23386  1156  23389 0

c  -1-1 --> -2
c    ( b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧  b^{289, 4}_0 ∧ -p_1156) -> ( b^{289, 5}_2 ∧  b^{289, 5}_1 ∧ -b^{289, 5}_0)
c  in CNF:
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨  b^{289, 5}_2
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨  b^{289, 5}_1
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨  p_1156 ∨ -b^{289, 5}_0
c  in DIMACS:
-23384  23385 -23386  1156  23387 0
-23384  23385 -23386  1156  23388 0
-23384  23385 -23386  1156 -23389 0

c  -2-1 --> break 
c    ( b^{289, 4}_2 ∧  b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧ -p_1156) -> break
c  in CNF:
c    -b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨  b^{289, 4}_0 ∨  p_1156 ∨ break
c  in DIMACS:
-23384 -23385  23386  1156 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{289, 4}_2 ∧ -b^{289, 4}_1 ∧ -b^{289, 4}_0 ∧ true) 
c  in CNF:
c    -b^{289, 4}_2 ∨  b^{289, 4}_1 ∨  b^{289, 4}_0 ∨ false 
c  in DIMACS:
-23384  23385  23386  0

c  3 does not represent an automaton state.
c    -(-b^{289, 4}_2 ∧  b^{289, 4}_1 ∧  b^{289, 4}_0 ∧ true) 
c  in CNF:
c     b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ false 
c  in DIMACS:
 23384 -23385 -23386  0
c  -3 does not represent an automaton state.
c    -( b^{289, 4}_2 ∧  b^{289, 4}_1 ∧  b^{289, 4}_0 ∧ true) 
c  in CNF:
c    -b^{289, 4}_2 ∨ -b^{289, 4}_1 ∨ -b^{289, 4}_0 ∨ false 
c  in DIMACS:
-23384 -23385 -23386  0

c INIT for k = 290
c    -b^{290, 1}_2
c    -b^{290, 1}_1
c    -b^{290, 1}_0
c  in DIMACS:
-23390 0
-23391 0
-23392 0

c Transitions for k = 290
c i = 1
c  -2+1 --> -1
c    ( b^{290, 1}_2 ∧  b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧  p_290) -> ( b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0)
c  in CNF:
c    -b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨  b^{290, 2}_2
c    -b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_1
c    -b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨  b^{290, 2}_0
c  in DIMACS:
-23390 -23391  23392 -290  23393 0
-23390 -23391  23392 -290 -23394 0
-23390 -23391  23392 -290  23395 0

c  -1+1 --> 0
c    ( b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧  b^{290, 1}_0 ∧  p_290) -> (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧ -b^{290, 2}_0)
c  in CNF:
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_2
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_1
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_0
c  in DIMACS:
-23390  23391 -23392 -290 -23393 0
-23390  23391 -23392 -290 -23394 0
-23390  23391 -23392 -290 -23395 0

c  0+1 --> 1
c    (-b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧  p_290) -> (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0)
c  in CNF:
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_2
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_1
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨  b^{290, 2}_0
c  in DIMACS:
 23390  23391  23392 -290 -23393 0
 23390  23391  23392 -290 -23394 0
 23390  23391  23392 -290  23395 0

c  1+1 --> 2
c    (-b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧  b^{290, 1}_0 ∧  p_290) -> (-b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0)
c  in CNF:
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_2
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨  b^{290, 2}_1
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ -p_290 ∨ -b^{290, 2}_0
c  in DIMACS:
 23390  23391 -23392 -290 -23393 0
 23390  23391 -23392 -290  23394 0
 23390  23391 -23392 -290 -23395 0

c  2+1 --> break 
c    (-b^{290, 1}_2 ∧  b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧  p_290) -> break
c  in CNF:
c     b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ -p_290 ∨ break
c  in DIMACS:
 23390 -23391  23392 -290 1162 0


c  2-1 --> 1
c    (-b^{290, 1}_2 ∧  b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧ -p_290) -> (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0)
c  in CNF:
c     b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_2
c     b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_1
c     b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨  b^{290, 2}_0
c  in DIMACS:
 23390 -23391  23392  290 -23393 0
 23390 -23391  23392  290 -23394 0
 23390 -23391  23392  290  23395 0

c  1-1 --> 0
c    (-b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧  b^{290, 1}_0 ∧ -p_290) -> (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧ -b^{290, 2}_0)
c  in CNF:
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_2
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_1
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_0
c  in DIMACS:
 23390  23391 -23392  290 -23393 0
 23390  23391 -23392  290 -23394 0
 23390  23391 -23392  290 -23395 0

c  0-1 --> -1
c    (-b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧ -p_290) -> ( b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0)
c  in CNF:
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨  b^{290, 2}_2
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_1
c     b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨  b^{290, 2}_0
c  in DIMACS:
 23390  23391  23392  290  23393 0
 23390  23391  23392  290 -23394 0
 23390  23391  23392  290  23395 0

c  -1-1 --> -2
c    ( b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧  b^{290, 1}_0 ∧ -p_290) -> ( b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0)
c  in CNF:
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨  b^{290, 2}_2
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨  b^{290, 2}_1
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨  p_290 ∨ -b^{290, 2}_0
c  in DIMACS:
-23390  23391 -23392  290  23393 0
-23390  23391 -23392  290  23394 0
-23390  23391 -23392  290 -23395 0

c  -2-1 --> break 
c    ( b^{290, 1}_2 ∧  b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧ -p_290) -> break
c  in CNF:
c    -b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨  b^{290, 1}_0 ∨  p_290 ∨ break
c  in DIMACS:
-23390 -23391  23392  290 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{290, 1}_2 ∧ -b^{290, 1}_1 ∧ -b^{290, 1}_0 ∧ true) 
c  in CNF:
c    -b^{290, 1}_2 ∨  b^{290, 1}_1 ∨  b^{290, 1}_0 ∨ false 
c  in DIMACS:
-23390  23391  23392  0

c  3 does not represent an automaton state.
c    -(-b^{290, 1}_2 ∧  b^{290, 1}_1 ∧  b^{290, 1}_0 ∧ true) 
c  in CNF:
c     b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ false 
c  in DIMACS:
 23390 -23391 -23392  0
c  -3 does not represent an automaton state.
c    -( b^{290, 1}_2 ∧  b^{290, 1}_1 ∧  b^{290, 1}_0 ∧ true) 
c  in CNF:
c    -b^{290, 1}_2 ∨ -b^{290, 1}_1 ∨ -b^{290, 1}_0 ∨ false 
c  in DIMACS:
-23390 -23391 -23392  0

c i = 2
c  -2+1 --> -1
c    ( b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧  p_580) -> ( b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0)
c  in CNF:
c    -b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨  b^{290, 3}_2
c    -b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_1
c    -b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨  b^{290, 3}_0
c  in DIMACS:
-23393 -23394  23395 -580  23396 0
-23393 -23394  23395 -580 -23397 0
-23393 -23394  23395 -580  23398 0

c  -1+1 --> 0
c    ( b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0 ∧  p_580) -> (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧ -b^{290, 3}_0)
c  in CNF:
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_2
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_1
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_0
c  in DIMACS:
-23393  23394 -23395 -580 -23396 0
-23393  23394 -23395 -580 -23397 0
-23393  23394 -23395 -580 -23398 0

c  0+1 --> 1
c    (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧  p_580) -> (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0)
c  in CNF:
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_2
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_1
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨  b^{290, 3}_0
c  in DIMACS:
 23393  23394  23395 -580 -23396 0
 23393  23394  23395 -580 -23397 0
 23393  23394  23395 -580  23398 0

c  1+1 --> 2
c    (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0 ∧  p_580) -> (-b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0)
c  in CNF:
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_2
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨  b^{290, 3}_1
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ -p_580 ∨ -b^{290, 3}_0
c  in DIMACS:
 23393  23394 -23395 -580 -23396 0
 23393  23394 -23395 -580  23397 0
 23393  23394 -23395 -580 -23398 0

c  2+1 --> break 
c    (-b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧  p_580) -> break
c  in CNF:
c     b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ -p_580 ∨ break
c  in DIMACS:
 23393 -23394  23395 -580 1162 0


c  2-1 --> 1
c    (-b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧ -p_580) -> (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0)
c  in CNF:
c     b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_2
c     b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_1
c     b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨  b^{290, 3}_0
c  in DIMACS:
 23393 -23394  23395  580 -23396 0
 23393 -23394  23395  580 -23397 0
 23393 -23394  23395  580  23398 0

c  1-1 --> 0
c    (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0 ∧ -p_580) -> (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧ -b^{290, 3}_0)
c  in CNF:
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_2
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_1
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_0
c  in DIMACS:
 23393  23394 -23395  580 -23396 0
 23393  23394 -23395  580 -23397 0
 23393  23394 -23395  580 -23398 0

c  0-1 --> -1
c    (-b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧ -p_580) -> ( b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0)
c  in CNF:
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨  b^{290, 3}_2
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_1
c     b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨  b^{290, 3}_0
c  in DIMACS:
 23393  23394  23395  580  23396 0
 23393  23394  23395  580 -23397 0
 23393  23394  23395  580  23398 0

c  -1-1 --> -2
c    ( b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧  b^{290, 2}_0 ∧ -p_580) -> ( b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0)
c  in CNF:
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨  b^{290, 3}_2
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨  b^{290, 3}_1
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨  p_580 ∨ -b^{290, 3}_0
c  in DIMACS:
-23393  23394 -23395  580  23396 0
-23393  23394 -23395  580  23397 0
-23393  23394 -23395  580 -23398 0

c  -2-1 --> break 
c    ( b^{290, 2}_2 ∧  b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧ -p_580) -> break
c  in CNF:
c    -b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨  b^{290, 2}_0 ∨  p_580 ∨ break
c  in DIMACS:
-23393 -23394  23395  580 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{290, 2}_2 ∧ -b^{290, 2}_1 ∧ -b^{290, 2}_0 ∧ true) 
c  in CNF:
c    -b^{290, 2}_2 ∨  b^{290, 2}_1 ∨  b^{290, 2}_0 ∨ false 
c  in DIMACS:
-23393  23394  23395  0

c  3 does not represent an automaton state.
c    -(-b^{290, 2}_2 ∧  b^{290, 2}_1 ∧  b^{290, 2}_0 ∧ true) 
c  in CNF:
c     b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ false 
c  in DIMACS:
 23393 -23394 -23395  0
c  -3 does not represent an automaton state.
c    -( b^{290, 2}_2 ∧  b^{290, 2}_1 ∧  b^{290, 2}_0 ∧ true) 
c  in CNF:
c    -b^{290, 2}_2 ∨ -b^{290, 2}_1 ∨ -b^{290, 2}_0 ∨ false 
c  in DIMACS:
-23393 -23394 -23395  0

c i = 3
c  -2+1 --> -1
c    ( b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧  p_870) -> ( b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0)
c  in CNF:
c    -b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨  b^{290, 4}_2
c    -b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_1
c    -b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨  b^{290, 4}_0
c  in DIMACS:
-23396 -23397  23398 -870  23399 0
-23396 -23397  23398 -870 -23400 0
-23396 -23397  23398 -870  23401 0

c  -1+1 --> 0
c    ( b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0 ∧  p_870) -> (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧ -b^{290, 4}_0)
c  in CNF:
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_2
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_1
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_0
c  in DIMACS:
-23396  23397 -23398 -870 -23399 0
-23396  23397 -23398 -870 -23400 0
-23396  23397 -23398 -870 -23401 0

c  0+1 --> 1
c    (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧  p_870) -> (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0)
c  in CNF:
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_2
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_1
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨  b^{290, 4}_0
c  in DIMACS:
 23396  23397  23398 -870 -23399 0
 23396  23397  23398 -870 -23400 0
 23396  23397  23398 -870  23401 0

c  1+1 --> 2
c    (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0 ∧  p_870) -> (-b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0)
c  in CNF:
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_2
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨  b^{290, 4}_1
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ -p_870 ∨ -b^{290, 4}_0
c  in DIMACS:
 23396  23397 -23398 -870 -23399 0
 23396  23397 -23398 -870  23400 0
 23396  23397 -23398 -870 -23401 0

c  2+1 --> break 
c    (-b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧  p_870) -> break
c  in CNF:
c     b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ -p_870 ∨ break
c  in DIMACS:
 23396 -23397  23398 -870 1162 0


c  2-1 --> 1
c    (-b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧ -p_870) -> (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0)
c  in CNF:
c     b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_2
c     b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_1
c     b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨  b^{290, 4}_0
c  in DIMACS:
 23396 -23397  23398  870 -23399 0
 23396 -23397  23398  870 -23400 0
 23396 -23397  23398  870  23401 0

c  1-1 --> 0
c    (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0 ∧ -p_870) -> (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧ -b^{290, 4}_0)
c  in CNF:
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_2
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_1
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_0
c  in DIMACS:
 23396  23397 -23398  870 -23399 0
 23396  23397 -23398  870 -23400 0
 23396  23397 -23398  870 -23401 0

c  0-1 --> -1
c    (-b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧ -p_870) -> ( b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0)
c  in CNF:
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨  b^{290, 4}_2
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_1
c     b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨  b^{290, 4}_0
c  in DIMACS:
 23396  23397  23398  870  23399 0
 23396  23397  23398  870 -23400 0
 23396  23397  23398  870  23401 0

c  -1-1 --> -2
c    ( b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧  b^{290, 3}_0 ∧ -p_870) -> ( b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0)
c  in CNF:
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨  b^{290, 4}_2
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨  b^{290, 4}_1
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨  p_870 ∨ -b^{290, 4}_0
c  in DIMACS:
-23396  23397 -23398  870  23399 0
-23396  23397 -23398  870  23400 0
-23396  23397 -23398  870 -23401 0

c  -2-1 --> break 
c    ( b^{290, 3}_2 ∧  b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧ -p_870) -> break
c  in CNF:
c    -b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨  b^{290, 3}_0 ∨  p_870 ∨ break
c  in DIMACS:
-23396 -23397  23398  870 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{290, 3}_2 ∧ -b^{290, 3}_1 ∧ -b^{290, 3}_0 ∧ true) 
c  in CNF:
c    -b^{290, 3}_2 ∨  b^{290, 3}_1 ∨  b^{290, 3}_0 ∨ false 
c  in DIMACS:
-23396  23397  23398  0

c  3 does not represent an automaton state.
c    -(-b^{290, 3}_2 ∧  b^{290, 3}_1 ∧  b^{290, 3}_0 ∧ true) 
c  in CNF:
c     b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ false 
c  in DIMACS:
 23396 -23397 -23398  0
c  -3 does not represent an automaton state.
c    -( b^{290, 3}_2 ∧  b^{290, 3}_1 ∧  b^{290, 3}_0 ∧ true) 
c  in CNF:
c    -b^{290, 3}_2 ∨ -b^{290, 3}_1 ∨ -b^{290, 3}_0 ∨ false 
c  in DIMACS:
-23396 -23397 -23398  0

c i = 4
c  -2+1 --> -1
c    ( b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧  p_1160) -> ( b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧  b^{290, 5}_0)
c  in CNF:
c    -b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨  b^{290, 5}_2
c    -b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_1
c    -b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨  b^{290, 5}_0
c  in DIMACS:
-23399 -23400  23401 -1160  23402 0
-23399 -23400  23401 -1160 -23403 0
-23399 -23400  23401 -1160  23404 0

c  -1+1 --> 0
c    ( b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0 ∧  p_1160) -> (-b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧ -b^{290, 5}_0)
c  in CNF:
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_2
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_1
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_0
c  in DIMACS:
-23399  23400 -23401 -1160 -23402 0
-23399  23400 -23401 -1160 -23403 0
-23399  23400 -23401 -1160 -23404 0

c  0+1 --> 1
c    (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧  p_1160) -> (-b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧  b^{290, 5}_0)
c  in CNF:
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_2
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_1
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨  b^{290, 5}_0
c  in DIMACS:
 23399  23400  23401 -1160 -23402 0
 23399  23400  23401 -1160 -23403 0
 23399  23400  23401 -1160  23404 0

c  1+1 --> 2
c    (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0 ∧  p_1160) -> (-b^{290, 5}_2 ∧  b^{290, 5}_1 ∧ -b^{290, 5}_0)
c  in CNF:
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_2
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨  b^{290, 5}_1
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ -p_1160 ∨ -b^{290, 5}_0
c  in DIMACS:
 23399  23400 -23401 -1160 -23402 0
 23399  23400 -23401 -1160  23403 0
 23399  23400 -23401 -1160 -23404 0

c  2+1 --> break 
c    (-b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧  p_1160) -> break
c  in CNF:
c     b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ -p_1160 ∨ break
c  in DIMACS:
 23399 -23400  23401 -1160 1162 0


c  2-1 --> 1
c    (-b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧ -p_1160) -> (-b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧  b^{290, 5}_0)
c  in CNF:
c     b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_2
c     b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_1
c     b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨  b^{290, 5}_0
c  in DIMACS:
 23399 -23400  23401  1160 -23402 0
 23399 -23400  23401  1160 -23403 0
 23399 -23400  23401  1160  23404 0

c  1-1 --> 0
c    (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0 ∧ -p_1160) -> (-b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧ -b^{290, 5}_0)
c  in CNF:
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_2
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_1
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_0
c  in DIMACS:
 23399  23400 -23401  1160 -23402 0
 23399  23400 -23401  1160 -23403 0
 23399  23400 -23401  1160 -23404 0

c  0-1 --> -1
c    (-b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧ -p_1160) -> ( b^{290, 5}_2 ∧ -b^{290, 5}_1 ∧  b^{290, 5}_0)
c  in CNF:
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨  b^{290, 5}_2
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_1
c     b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨  b^{290, 5}_0
c  in DIMACS:
 23399  23400  23401  1160  23402 0
 23399  23400  23401  1160 -23403 0
 23399  23400  23401  1160  23404 0

c  -1-1 --> -2
c    ( b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧  b^{290, 4}_0 ∧ -p_1160) -> ( b^{290, 5}_2 ∧  b^{290, 5}_1 ∧ -b^{290, 5}_0)
c  in CNF:
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨  b^{290, 5}_2
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨  b^{290, 5}_1
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨  p_1160 ∨ -b^{290, 5}_0
c  in DIMACS:
-23399  23400 -23401  1160  23402 0
-23399  23400 -23401  1160  23403 0
-23399  23400 -23401  1160 -23404 0

c  -2-1 --> break 
c    ( b^{290, 4}_2 ∧  b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧ -p_1160) -> break
c  in CNF:
c    -b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨  b^{290, 4}_0 ∨  p_1160 ∨ break
c  in DIMACS:
-23399 -23400  23401  1160 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{290, 4}_2 ∧ -b^{290, 4}_1 ∧ -b^{290, 4}_0 ∧ true) 
c  in CNF:
c    -b^{290, 4}_2 ∨  b^{290, 4}_1 ∨  b^{290, 4}_0 ∨ false 
c  in DIMACS:
-23399  23400  23401  0

c  3 does not represent an automaton state.
c    -(-b^{290, 4}_2 ∧  b^{290, 4}_1 ∧  b^{290, 4}_0 ∧ true) 
c  in CNF:
c     b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ false 
c  in DIMACS:
 23399 -23400 -23401  0
c  -3 does not represent an automaton state.
c    -( b^{290, 4}_2 ∧  b^{290, 4}_1 ∧  b^{290, 4}_0 ∧ true) 
c  in CNF:
c    -b^{290, 4}_2 ∨ -b^{290, 4}_1 ∨ -b^{290, 4}_0 ∨ false 
c  in DIMACS:
-23399 -23400 -23401  0

c INIT for k = 291
c    -b^{291, 1}_2
c    -b^{291, 1}_1
c    -b^{291, 1}_0
c  in DIMACS:
-23405 0
-23406 0
-23407 0

c Transitions for k = 291
c i = 1
c  -2+1 --> -1
c    ( b^{291, 1}_2 ∧  b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧  p_291) -> ( b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0)
c  in CNF:
c    -b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨  b^{291, 2}_2
c    -b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_1
c    -b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨  b^{291, 2}_0
c  in DIMACS:
-23405 -23406  23407 -291  23408 0
-23405 -23406  23407 -291 -23409 0
-23405 -23406  23407 -291  23410 0

c  -1+1 --> 0
c    ( b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧  b^{291, 1}_0 ∧  p_291) -> (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧ -b^{291, 2}_0)
c  in CNF:
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_2
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_1
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_0
c  in DIMACS:
-23405  23406 -23407 -291 -23408 0
-23405  23406 -23407 -291 -23409 0
-23405  23406 -23407 -291 -23410 0

c  0+1 --> 1
c    (-b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧  p_291) -> (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0)
c  in CNF:
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_2
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_1
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨  b^{291, 2}_0
c  in DIMACS:
 23405  23406  23407 -291 -23408 0
 23405  23406  23407 -291 -23409 0
 23405  23406  23407 -291  23410 0

c  1+1 --> 2
c    (-b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧  b^{291, 1}_0 ∧  p_291) -> (-b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0)
c  in CNF:
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_2
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨  b^{291, 2}_1
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ -p_291 ∨ -b^{291, 2}_0
c  in DIMACS:
 23405  23406 -23407 -291 -23408 0
 23405  23406 -23407 -291  23409 0
 23405  23406 -23407 -291 -23410 0

c  2+1 --> break 
c    (-b^{291, 1}_2 ∧  b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧  p_291) -> break
c  in CNF:
c     b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ -p_291 ∨ break
c  in DIMACS:
 23405 -23406  23407 -291 1162 0


c  2-1 --> 1
c    (-b^{291, 1}_2 ∧  b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧ -p_291) -> (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0)
c  in CNF:
c     b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_2
c     b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_1
c     b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨  b^{291, 2}_0
c  in DIMACS:
 23405 -23406  23407  291 -23408 0
 23405 -23406  23407  291 -23409 0
 23405 -23406  23407  291  23410 0

c  1-1 --> 0
c    (-b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧  b^{291, 1}_0 ∧ -p_291) -> (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧ -b^{291, 2}_0)
c  in CNF:
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_2
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_1
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_0
c  in DIMACS:
 23405  23406 -23407  291 -23408 0
 23405  23406 -23407  291 -23409 0
 23405  23406 -23407  291 -23410 0

c  0-1 --> -1
c    (-b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧ -p_291) -> ( b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0)
c  in CNF:
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨  b^{291, 2}_2
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_1
c     b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨  b^{291, 2}_0
c  in DIMACS:
 23405  23406  23407  291  23408 0
 23405  23406  23407  291 -23409 0
 23405  23406  23407  291  23410 0

c  -1-1 --> -2
c    ( b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧  b^{291, 1}_0 ∧ -p_291) -> ( b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0)
c  in CNF:
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨  b^{291, 2}_2
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨  b^{291, 2}_1
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨  p_291 ∨ -b^{291, 2}_0
c  in DIMACS:
-23405  23406 -23407  291  23408 0
-23405  23406 -23407  291  23409 0
-23405  23406 -23407  291 -23410 0

c  -2-1 --> break 
c    ( b^{291, 1}_2 ∧  b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧ -p_291) -> break
c  in CNF:
c    -b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨  b^{291, 1}_0 ∨  p_291 ∨ break
c  in DIMACS:
-23405 -23406  23407  291 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{291, 1}_2 ∧ -b^{291, 1}_1 ∧ -b^{291, 1}_0 ∧ true) 
c  in CNF:
c    -b^{291, 1}_2 ∨  b^{291, 1}_1 ∨  b^{291, 1}_0 ∨ false 
c  in DIMACS:
-23405  23406  23407  0

c  3 does not represent an automaton state.
c    -(-b^{291, 1}_2 ∧  b^{291, 1}_1 ∧  b^{291, 1}_0 ∧ true) 
c  in CNF:
c     b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ false 
c  in DIMACS:
 23405 -23406 -23407  0
c  -3 does not represent an automaton state.
c    -( b^{291, 1}_2 ∧  b^{291, 1}_1 ∧  b^{291, 1}_0 ∧ true) 
c  in CNF:
c    -b^{291, 1}_2 ∨ -b^{291, 1}_1 ∨ -b^{291, 1}_0 ∨ false 
c  in DIMACS:
-23405 -23406 -23407  0

c i = 2
c  -2+1 --> -1
c    ( b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧  p_582) -> ( b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0)
c  in CNF:
c    -b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨  b^{291, 3}_2
c    -b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_1
c    -b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨  b^{291, 3}_0
c  in DIMACS:
-23408 -23409  23410 -582  23411 0
-23408 -23409  23410 -582 -23412 0
-23408 -23409  23410 -582  23413 0

c  -1+1 --> 0
c    ( b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0 ∧  p_582) -> (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧ -b^{291, 3}_0)
c  in CNF:
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_2
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_1
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_0
c  in DIMACS:
-23408  23409 -23410 -582 -23411 0
-23408  23409 -23410 -582 -23412 0
-23408  23409 -23410 -582 -23413 0

c  0+1 --> 1
c    (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧  p_582) -> (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0)
c  in CNF:
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_2
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_1
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨  b^{291, 3}_0
c  in DIMACS:
 23408  23409  23410 -582 -23411 0
 23408  23409  23410 -582 -23412 0
 23408  23409  23410 -582  23413 0

c  1+1 --> 2
c    (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0 ∧  p_582) -> (-b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0)
c  in CNF:
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_2
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨  b^{291, 3}_1
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ -p_582 ∨ -b^{291, 3}_0
c  in DIMACS:
 23408  23409 -23410 -582 -23411 0
 23408  23409 -23410 -582  23412 0
 23408  23409 -23410 -582 -23413 0

c  2+1 --> break 
c    (-b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧  p_582) -> break
c  in CNF:
c     b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ -p_582 ∨ break
c  in DIMACS:
 23408 -23409  23410 -582 1162 0


c  2-1 --> 1
c    (-b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧ -p_582) -> (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0)
c  in CNF:
c     b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_2
c     b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_1
c     b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨  b^{291, 3}_0
c  in DIMACS:
 23408 -23409  23410  582 -23411 0
 23408 -23409  23410  582 -23412 0
 23408 -23409  23410  582  23413 0

c  1-1 --> 0
c    (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0 ∧ -p_582) -> (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧ -b^{291, 3}_0)
c  in CNF:
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_2
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_1
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_0
c  in DIMACS:
 23408  23409 -23410  582 -23411 0
 23408  23409 -23410  582 -23412 0
 23408  23409 -23410  582 -23413 0

c  0-1 --> -1
c    (-b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧ -p_582) -> ( b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0)
c  in CNF:
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨  b^{291, 3}_2
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_1
c     b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨  b^{291, 3}_0
c  in DIMACS:
 23408  23409  23410  582  23411 0
 23408  23409  23410  582 -23412 0
 23408  23409  23410  582  23413 0

c  -1-1 --> -2
c    ( b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧  b^{291, 2}_0 ∧ -p_582) -> ( b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0)
c  in CNF:
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨  b^{291, 3}_2
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨  b^{291, 3}_1
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨  p_582 ∨ -b^{291, 3}_0
c  in DIMACS:
-23408  23409 -23410  582  23411 0
-23408  23409 -23410  582  23412 0
-23408  23409 -23410  582 -23413 0

c  -2-1 --> break 
c    ( b^{291, 2}_2 ∧  b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧ -p_582) -> break
c  in CNF:
c    -b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨  b^{291, 2}_0 ∨  p_582 ∨ break
c  in DIMACS:
-23408 -23409  23410  582 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{291, 2}_2 ∧ -b^{291, 2}_1 ∧ -b^{291, 2}_0 ∧ true) 
c  in CNF:
c    -b^{291, 2}_2 ∨  b^{291, 2}_1 ∨  b^{291, 2}_0 ∨ false 
c  in DIMACS:
-23408  23409  23410  0

c  3 does not represent an automaton state.
c    -(-b^{291, 2}_2 ∧  b^{291, 2}_1 ∧  b^{291, 2}_0 ∧ true) 
c  in CNF:
c     b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ false 
c  in DIMACS:
 23408 -23409 -23410  0
c  -3 does not represent an automaton state.
c    -( b^{291, 2}_2 ∧  b^{291, 2}_1 ∧  b^{291, 2}_0 ∧ true) 
c  in CNF:
c    -b^{291, 2}_2 ∨ -b^{291, 2}_1 ∨ -b^{291, 2}_0 ∨ false 
c  in DIMACS:
-23408 -23409 -23410  0

c i = 3
c  -2+1 --> -1
c    ( b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧  p_873) -> ( b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧  b^{291, 4}_0)
c  in CNF:
c    -b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨  b^{291, 4}_2
c    -b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_1
c    -b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨  b^{291, 4}_0
c  in DIMACS:
-23411 -23412  23413 -873  23414 0
-23411 -23412  23413 -873 -23415 0
-23411 -23412  23413 -873  23416 0

c  -1+1 --> 0
c    ( b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0 ∧  p_873) -> (-b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧ -b^{291, 4}_0)
c  in CNF:
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_2
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_1
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_0
c  in DIMACS:
-23411  23412 -23413 -873 -23414 0
-23411  23412 -23413 -873 -23415 0
-23411  23412 -23413 -873 -23416 0

c  0+1 --> 1
c    (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧  p_873) -> (-b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧  b^{291, 4}_0)
c  in CNF:
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_2
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_1
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨  b^{291, 4}_0
c  in DIMACS:
 23411  23412  23413 -873 -23414 0
 23411  23412  23413 -873 -23415 0
 23411  23412  23413 -873  23416 0

c  1+1 --> 2
c    (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0 ∧  p_873) -> (-b^{291, 4}_2 ∧  b^{291, 4}_1 ∧ -b^{291, 4}_0)
c  in CNF:
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_2
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨  b^{291, 4}_1
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ -p_873 ∨ -b^{291, 4}_0
c  in DIMACS:
 23411  23412 -23413 -873 -23414 0
 23411  23412 -23413 -873  23415 0
 23411  23412 -23413 -873 -23416 0

c  2+1 --> break 
c    (-b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧  p_873) -> break
c  in CNF:
c     b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ -p_873 ∨ break
c  in DIMACS:
 23411 -23412  23413 -873 1162 0


c  2-1 --> 1
c    (-b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧ -p_873) -> (-b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧  b^{291, 4}_0)
c  in CNF:
c     b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_2
c     b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_1
c     b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨  b^{291, 4}_0
c  in DIMACS:
 23411 -23412  23413  873 -23414 0
 23411 -23412  23413  873 -23415 0
 23411 -23412  23413  873  23416 0

c  1-1 --> 0
c    (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0 ∧ -p_873) -> (-b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧ -b^{291, 4}_0)
c  in CNF:
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_2
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_1
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_0
c  in DIMACS:
 23411  23412 -23413  873 -23414 0
 23411  23412 -23413  873 -23415 0
 23411  23412 -23413  873 -23416 0

c  0-1 --> -1
c    (-b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧ -p_873) -> ( b^{291, 4}_2 ∧ -b^{291, 4}_1 ∧  b^{291, 4}_0)
c  in CNF:
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨  b^{291, 4}_2
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_1
c     b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨  b^{291, 4}_0
c  in DIMACS:
 23411  23412  23413  873  23414 0
 23411  23412  23413  873 -23415 0
 23411  23412  23413  873  23416 0

c  -1-1 --> -2
c    ( b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧  b^{291, 3}_0 ∧ -p_873) -> ( b^{291, 4}_2 ∧  b^{291, 4}_1 ∧ -b^{291, 4}_0)
c  in CNF:
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨  b^{291, 4}_2
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨  b^{291, 4}_1
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨  p_873 ∨ -b^{291, 4}_0
c  in DIMACS:
-23411  23412 -23413  873  23414 0
-23411  23412 -23413  873  23415 0
-23411  23412 -23413  873 -23416 0

c  -2-1 --> break 
c    ( b^{291, 3}_2 ∧  b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧ -p_873) -> break
c  in CNF:
c    -b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨  b^{291, 3}_0 ∨  p_873 ∨ break
c  in DIMACS:
-23411 -23412  23413  873 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{291, 3}_2 ∧ -b^{291, 3}_1 ∧ -b^{291, 3}_0 ∧ true) 
c  in CNF:
c    -b^{291, 3}_2 ∨  b^{291, 3}_1 ∨  b^{291, 3}_0 ∨ false 
c  in DIMACS:
-23411  23412  23413  0

c  3 does not represent an automaton state.
c    -(-b^{291, 3}_2 ∧  b^{291, 3}_1 ∧  b^{291, 3}_0 ∧ true) 
c  in CNF:
c     b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ false 
c  in DIMACS:
 23411 -23412 -23413  0
c  -3 does not represent an automaton state.
c    -( b^{291, 3}_2 ∧  b^{291, 3}_1 ∧  b^{291, 3}_0 ∧ true) 
c  in CNF:
c    -b^{291, 3}_2 ∨ -b^{291, 3}_1 ∨ -b^{291, 3}_0 ∨ false 
c  in DIMACS:
-23411 -23412 -23413  0

c INIT for k = 292
c    -b^{292, 1}_2
c    -b^{292, 1}_1
c    -b^{292, 1}_0
c  in DIMACS:
-23417 0
-23418 0
-23419 0

c Transitions for k = 292
c i = 1
c  -2+1 --> -1
c    ( b^{292, 1}_2 ∧  b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧  p_292) -> ( b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0)
c  in CNF:
c    -b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨  b^{292, 2}_2
c    -b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_1
c    -b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨  b^{292, 2}_0
c  in DIMACS:
-23417 -23418  23419 -292  23420 0
-23417 -23418  23419 -292 -23421 0
-23417 -23418  23419 -292  23422 0

c  -1+1 --> 0
c    ( b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧  b^{292, 1}_0 ∧  p_292) -> (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧ -b^{292, 2}_0)
c  in CNF:
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_2
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_1
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_0
c  in DIMACS:
-23417  23418 -23419 -292 -23420 0
-23417  23418 -23419 -292 -23421 0
-23417  23418 -23419 -292 -23422 0

c  0+1 --> 1
c    (-b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧  p_292) -> (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0)
c  in CNF:
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_2
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_1
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨  b^{292, 2}_0
c  in DIMACS:
 23417  23418  23419 -292 -23420 0
 23417  23418  23419 -292 -23421 0
 23417  23418  23419 -292  23422 0

c  1+1 --> 2
c    (-b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧  b^{292, 1}_0 ∧  p_292) -> (-b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0)
c  in CNF:
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_2
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨  b^{292, 2}_1
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ -p_292 ∨ -b^{292, 2}_0
c  in DIMACS:
 23417  23418 -23419 -292 -23420 0
 23417  23418 -23419 -292  23421 0
 23417  23418 -23419 -292 -23422 0

c  2+1 --> break 
c    (-b^{292, 1}_2 ∧  b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧  p_292) -> break
c  in CNF:
c     b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ -p_292 ∨ break
c  in DIMACS:
 23417 -23418  23419 -292 1162 0


c  2-1 --> 1
c    (-b^{292, 1}_2 ∧  b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧ -p_292) -> (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0)
c  in CNF:
c     b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_2
c     b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_1
c     b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨  b^{292, 2}_0
c  in DIMACS:
 23417 -23418  23419  292 -23420 0
 23417 -23418  23419  292 -23421 0
 23417 -23418  23419  292  23422 0

c  1-1 --> 0
c    (-b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧  b^{292, 1}_0 ∧ -p_292) -> (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧ -b^{292, 2}_0)
c  in CNF:
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_2
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_1
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_0
c  in DIMACS:
 23417  23418 -23419  292 -23420 0
 23417  23418 -23419  292 -23421 0
 23417  23418 -23419  292 -23422 0

c  0-1 --> -1
c    (-b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧ -p_292) -> ( b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0)
c  in CNF:
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨  b^{292, 2}_2
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_1
c     b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨  b^{292, 2}_0
c  in DIMACS:
 23417  23418  23419  292  23420 0
 23417  23418  23419  292 -23421 0
 23417  23418  23419  292  23422 0

c  -1-1 --> -2
c    ( b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧  b^{292, 1}_0 ∧ -p_292) -> ( b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0)
c  in CNF:
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨  b^{292, 2}_2
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨  b^{292, 2}_1
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨  p_292 ∨ -b^{292, 2}_0
c  in DIMACS:
-23417  23418 -23419  292  23420 0
-23417  23418 -23419  292  23421 0
-23417  23418 -23419  292 -23422 0

c  -2-1 --> break 
c    ( b^{292, 1}_2 ∧  b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧ -p_292) -> break
c  in CNF:
c    -b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨  b^{292, 1}_0 ∨  p_292 ∨ break
c  in DIMACS:
-23417 -23418  23419  292 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{292, 1}_2 ∧ -b^{292, 1}_1 ∧ -b^{292, 1}_0 ∧ true) 
c  in CNF:
c    -b^{292, 1}_2 ∨  b^{292, 1}_1 ∨  b^{292, 1}_0 ∨ false 
c  in DIMACS:
-23417  23418  23419  0

c  3 does not represent an automaton state.
c    -(-b^{292, 1}_2 ∧  b^{292, 1}_1 ∧  b^{292, 1}_0 ∧ true) 
c  in CNF:
c     b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ false 
c  in DIMACS:
 23417 -23418 -23419  0
c  -3 does not represent an automaton state.
c    -( b^{292, 1}_2 ∧  b^{292, 1}_1 ∧  b^{292, 1}_0 ∧ true) 
c  in CNF:
c    -b^{292, 1}_2 ∨ -b^{292, 1}_1 ∨ -b^{292, 1}_0 ∨ false 
c  in DIMACS:
-23417 -23418 -23419  0

c i = 2
c  -2+1 --> -1
c    ( b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧  p_584) -> ( b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0)
c  in CNF:
c    -b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨  b^{292, 3}_2
c    -b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_1
c    -b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨  b^{292, 3}_0
c  in DIMACS:
-23420 -23421  23422 -584  23423 0
-23420 -23421  23422 -584 -23424 0
-23420 -23421  23422 -584  23425 0

c  -1+1 --> 0
c    ( b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0 ∧  p_584) -> (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧ -b^{292, 3}_0)
c  in CNF:
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_2
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_1
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_0
c  in DIMACS:
-23420  23421 -23422 -584 -23423 0
-23420  23421 -23422 -584 -23424 0
-23420  23421 -23422 -584 -23425 0

c  0+1 --> 1
c    (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧  p_584) -> (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0)
c  in CNF:
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_2
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_1
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨  b^{292, 3}_0
c  in DIMACS:
 23420  23421  23422 -584 -23423 0
 23420  23421  23422 -584 -23424 0
 23420  23421  23422 -584  23425 0

c  1+1 --> 2
c    (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0 ∧  p_584) -> (-b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0)
c  in CNF:
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_2
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨  b^{292, 3}_1
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ -p_584 ∨ -b^{292, 3}_0
c  in DIMACS:
 23420  23421 -23422 -584 -23423 0
 23420  23421 -23422 -584  23424 0
 23420  23421 -23422 -584 -23425 0

c  2+1 --> break 
c    (-b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧  p_584) -> break
c  in CNF:
c     b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ -p_584 ∨ break
c  in DIMACS:
 23420 -23421  23422 -584 1162 0


c  2-1 --> 1
c    (-b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧ -p_584) -> (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0)
c  in CNF:
c     b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_2
c     b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_1
c     b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨  b^{292, 3}_0
c  in DIMACS:
 23420 -23421  23422  584 -23423 0
 23420 -23421  23422  584 -23424 0
 23420 -23421  23422  584  23425 0

c  1-1 --> 0
c    (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0 ∧ -p_584) -> (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧ -b^{292, 3}_0)
c  in CNF:
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_2
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_1
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_0
c  in DIMACS:
 23420  23421 -23422  584 -23423 0
 23420  23421 -23422  584 -23424 0
 23420  23421 -23422  584 -23425 0

c  0-1 --> -1
c    (-b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧ -p_584) -> ( b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0)
c  in CNF:
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨  b^{292, 3}_2
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_1
c     b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨  b^{292, 3}_0
c  in DIMACS:
 23420  23421  23422  584  23423 0
 23420  23421  23422  584 -23424 0
 23420  23421  23422  584  23425 0

c  -1-1 --> -2
c    ( b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧  b^{292, 2}_0 ∧ -p_584) -> ( b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0)
c  in CNF:
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨  b^{292, 3}_2
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨  b^{292, 3}_1
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨  p_584 ∨ -b^{292, 3}_0
c  in DIMACS:
-23420  23421 -23422  584  23423 0
-23420  23421 -23422  584  23424 0
-23420  23421 -23422  584 -23425 0

c  -2-1 --> break 
c    ( b^{292, 2}_2 ∧  b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧ -p_584) -> break
c  in CNF:
c    -b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨  b^{292, 2}_0 ∨  p_584 ∨ break
c  in DIMACS:
-23420 -23421  23422  584 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{292, 2}_2 ∧ -b^{292, 2}_1 ∧ -b^{292, 2}_0 ∧ true) 
c  in CNF:
c    -b^{292, 2}_2 ∨  b^{292, 2}_1 ∨  b^{292, 2}_0 ∨ false 
c  in DIMACS:
-23420  23421  23422  0

c  3 does not represent an automaton state.
c    -(-b^{292, 2}_2 ∧  b^{292, 2}_1 ∧  b^{292, 2}_0 ∧ true) 
c  in CNF:
c     b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ false 
c  in DIMACS:
 23420 -23421 -23422  0
c  -3 does not represent an automaton state.
c    -( b^{292, 2}_2 ∧  b^{292, 2}_1 ∧  b^{292, 2}_0 ∧ true) 
c  in CNF:
c    -b^{292, 2}_2 ∨ -b^{292, 2}_1 ∨ -b^{292, 2}_0 ∨ false 
c  in DIMACS:
-23420 -23421 -23422  0

c i = 3
c  -2+1 --> -1
c    ( b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧  p_876) -> ( b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧  b^{292, 4}_0)
c  in CNF:
c    -b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨  b^{292, 4}_2
c    -b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_1
c    -b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨  b^{292, 4}_0
c  in DIMACS:
-23423 -23424  23425 -876  23426 0
-23423 -23424  23425 -876 -23427 0
-23423 -23424  23425 -876  23428 0

c  -1+1 --> 0
c    ( b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0 ∧  p_876) -> (-b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧ -b^{292, 4}_0)
c  in CNF:
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_2
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_1
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_0
c  in DIMACS:
-23423  23424 -23425 -876 -23426 0
-23423  23424 -23425 -876 -23427 0
-23423  23424 -23425 -876 -23428 0

c  0+1 --> 1
c    (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧  p_876) -> (-b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧  b^{292, 4}_0)
c  in CNF:
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_2
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_1
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨  b^{292, 4}_0
c  in DIMACS:
 23423  23424  23425 -876 -23426 0
 23423  23424  23425 -876 -23427 0
 23423  23424  23425 -876  23428 0

c  1+1 --> 2
c    (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0 ∧  p_876) -> (-b^{292, 4}_2 ∧  b^{292, 4}_1 ∧ -b^{292, 4}_0)
c  in CNF:
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_2
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨  b^{292, 4}_1
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ -p_876 ∨ -b^{292, 4}_0
c  in DIMACS:
 23423  23424 -23425 -876 -23426 0
 23423  23424 -23425 -876  23427 0
 23423  23424 -23425 -876 -23428 0

c  2+1 --> break 
c    (-b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧  p_876) -> break
c  in CNF:
c     b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ -p_876 ∨ break
c  in DIMACS:
 23423 -23424  23425 -876 1162 0


c  2-1 --> 1
c    (-b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧ -p_876) -> (-b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧  b^{292, 4}_0)
c  in CNF:
c     b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_2
c     b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_1
c     b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨  b^{292, 4}_0
c  in DIMACS:
 23423 -23424  23425  876 -23426 0
 23423 -23424  23425  876 -23427 0
 23423 -23424  23425  876  23428 0

c  1-1 --> 0
c    (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0 ∧ -p_876) -> (-b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧ -b^{292, 4}_0)
c  in CNF:
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_2
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_1
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_0
c  in DIMACS:
 23423  23424 -23425  876 -23426 0
 23423  23424 -23425  876 -23427 0
 23423  23424 -23425  876 -23428 0

c  0-1 --> -1
c    (-b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧ -p_876) -> ( b^{292, 4}_2 ∧ -b^{292, 4}_1 ∧  b^{292, 4}_0)
c  in CNF:
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨  b^{292, 4}_2
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_1
c     b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨  b^{292, 4}_0
c  in DIMACS:
 23423  23424  23425  876  23426 0
 23423  23424  23425  876 -23427 0
 23423  23424  23425  876  23428 0

c  -1-1 --> -2
c    ( b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧  b^{292, 3}_0 ∧ -p_876) -> ( b^{292, 4}_2 ∧  b^{292, 4}_1 ∧ -b^{292, 4}_0)
c  in CNF:
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨  b^{292, 4}_2
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨  b^{292, 4}_1
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨  p_876 ∨ -b^{292, 4}_0
c  in DIMACS:
-23423  23424 -23425  876  23426 0
-23423  23424 -23425  876  23427 0
-23423  23424 -23425  876 -23428 0

c  -2-1 --> break 
c    ( b^{292, 3}_2 ∧  b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧ -p_876) -> break
c  in CNF:
c    -b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨  b^{292, 3}_0 ∨  p_876 ∨ break
c  in DIMACS:
-23423 -23424  23425  876 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{292, 3}_2 ∧ -b^{292, 3}_1 ∧ -b^{292, 3}_0 ∧ true) 
c  in CNF:
c    -b^{292, 3}_2 ∨  b^{292, 3}_1 ∨  b^{292, 3}_0 ∨ false 
c  in DIMACS:
-23423  23424  23425  0

c  3 does not represent an automaton state.
c    -(-b^{292, 3}_2 ∧  b^{292, 3}_1 ∧  b^{292, 3}_0 ∧ true) 
c  in CNF:
c     b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ false 
c  in DIMACS:
 23423 -23424 -23425  0
c  -3 does not represent an automaton state.
c    -( b^{292, 3}_2 ∧  b^{292, 3}_1 ∧  b^{292, 3}_0 ∧ true) 
c  in CNF:
c    -b^{292, 3}_2 ∨ -b^{292, 3}_1 ∨ -b^{292, 3}_0 ∨ false 
c  in DIMACS:
-23423 -23424 -23425  0

c INIT for k = 293
c    -b^{293, 1}_2
c    -b^{293, 1}_1
c    -b^{293, 1}_0
c  in DIMACS:
-23429 0
-23430 0
-23431 0

c Transitions for k = 293
c i = 1
c  -2+1 --> -1
c    ( b^{293, 1}_2 ∧  b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧  p_293) -> ( b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0)
c  in CNF:
c    -b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨  b^{293, 2}_2
c    -b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_1
c    -b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨  b^{293, 2}_0
c  in DIMACS:
-23429 -23430  23431 -293  23432 0
-23429 -23430  23431 -293 -23433 0
-23429 -23430  23431 -293  23434 0

c  -1+1 --> 0
c    ( b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧  b^{293, 1}_0 ∧  p_293) -> (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧ -b^{293, 2}_0)
c  in CNF:
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_2
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_1
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_0
c  in DIMACS:
-23429  23430 -23431 -293 -23432 0
-23429  23430 -23431 -293 -23433 0
-23429  23430 -23431 -293 -23434 0

c  0+1 --> 1
c    (-b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧  p_293) -> (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0)
c  in CNF:
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_2
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_1
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨  b^{293, 2}_0
c  in DIMACS:
 23429  23430  23431 -293 -23432 0
 23429  23430  23431 -293 -23433 0
 23429  23430  23431 -293  23434 0

c  1+1 --> 2
c    (-b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧  b^{293, 1}_0 ∧  p_293) -> (-b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0)
c  in CNF:
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_2
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨  b^{293, 2}_1
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ -p_293 ∨ -b^{293, 2}_0
c  in DIMACS:
 23429  23430 -23431 -293 -23432 0
 23429  23430 -23431 -293  23433 0
 23429  23430 -23431 -293 -23434 0

c  2+1 --> break 
c    (-b^{293, 1}_2 ∧  b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧  p_293) -> break
c  in CNF:
c     b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ -p_293 ∨ break
c  in DIMACS:
 23429 -23430  23431 -293 1162 0


c  2-1 --> 1
c    (-b^{293, 1}_2 ∧  b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧ -p_293) -> (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0)
c  in CNF:
c     b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_2
c     b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_1
c     b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨  b^{293, 2}_0
c  in DIMACS:
 23429 -23430  23431  293 -23432 0
 23429 -23430  23431  293 -23433 0
 23429 -23430  23431  293  23434 0

c  1-1 --> 0
c    (-b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧  b^{293, 1}_0 ∧ -p_293) -> (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧ -b^{293, 2}_0)
c  in CNF:
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_2
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_1
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_0
c  in DIMACS:
 23429  23430 -23431  293 -23432 0
 23429  23430 -23431  293 -23433 0
 23429  23430 -23431  293 -23434 0

c  0-1 --> -1
c    (-b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧ -p_293) -> ( b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0)
c  in CNF:
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨  b^{293, 2}_2
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_1
c     b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨  b^{293, 2}_0
c  in DIMACS:
 23429  23430  23431  293  23432 0
 23429  23430  23431  293 -23433 0
 23429  23430  23431  293  23434 0

c  -1-1 --> -2
c    ( b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧  b^{293, 1}_0 ∧ -p_293) -> ( b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0)
c  in CNF:
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨  b^{293, 2}_2
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨  b^{293, 2}_1
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨  p_293 ∨ -b^{293, 2}_0
c  in DIMACS:
-23429  23430 -23431  293  23432 0
-23429  23430 -23431  293  23433 0
-23429  23430 -23431  293 -23434 0

c  -2-1 --> break 
c    ( b^{293, 1}_2 ∧  b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧ -p_293) -> break
c  in CNF:
c    -b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨  b^{293, 1}_0 ∨  p_293 ∨ break
c  in DIMACS:
-23429 -23430  23431  293 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{293, 1}_2 ∧ -b^{293, 1}_1 ∧ -b^{293, 1}_0 ∧ true) 
c  in CNF:
c    -b^{293, 1}_2 ∨  b^{293, 1}_1 ∨  b^{293, 1}_0 ∨ false 
c  in DIMACS:
-23429  23430  23431  0

c  3 does not represent an automaton state.
c    -(-b^{293, 1}_2 ∧  b^{293, 1}_1 ∧  b^{293, 1}_0 ∧ true) 
c  in CNF:
c     b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ false 
c  in DIMACS:
 23429 -23430 -23431  0
c  -3 does not represent an automaton state.
c    -( b^{293, 1}_2 ∧  b^{293, 1}_1 ∧  b^{293, 1}_0 ∧ true) 
c  in CNF:
c    -b^{293, 1}_2 ∨ -b^{293, 1}_1 ∨ -b^{293, 1}_0 ∨ false 
c  in DIMACS:
-23429 -23430 -23431  0

c i = 2
c  -2+1 --> -1
c    ( b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧  p_586) -> ( b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0)
c  in CNF:
c    -b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨  b^{293, 3}_2
c    -b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_1
c    -b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨  b^{293, 3}_0
c  in DIMACS:
-23432 -23433  23434 -586  23435 0
-23432 -23433  23434 -586 -23436 0
-23432 -23433  23434 -586  23437 0

c  -1+1 --> 0
c    ( b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0 ∧  p_586) -> (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧ -b^{293, 3}_0)
c  in CNF:
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_2
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_1
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_0
c  in DIMACS:
-23432  23433 -23434 -586 -23435 0
-23432  23433 -23434 -586 -23436 0
-23432  23433 -23434 -586 -23437 0

c  0+1 --> 1
c    (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧  p_586) -> (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0)
c  in CNF:
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_2
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_1
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨  b^{293, 3}_0
c  in DIMACS:
 23432  23433  23434 -586 -23435 0
 23432  23433  23434 -586 -23436 0
 23432  23433  23434 -586  23437 0

c  1+1 --> 2
c    (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0 ∧  p_586) -> (-b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0)
c  in CNF:
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_2
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨  b^{293, 3}_1
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ -p_586 ∨ -b^{293, 3}_0
c  in DIMACS:
 23432  23433 -23434 -586 -23435 0
 23432  23433 -23434 -586  23436 0
 23432  23433 -23434 -586 -23437 0

c  2+1 --> break 
c    (-b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧  p_586) -> break
c  in CNF:
c     b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ -p_586 ∨ break
c  in DIMACS:
 23432 -23433  23434 -586 1162 0


c  2-1 --> 1
c    (-b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧ -p_586) -> (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0)
c  in CNF:
c     b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_2
c     b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_1
c     b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨  b^{293, 3}_0
c  in DIMACS:
 23432 -23433  23434  586 -23435 0
 23432 -23433  23434  586 -23436 0
 23432 -23433  23434  586  23437 0

c  1-1 --> 0
c    (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0 ∧ -p_586) -> (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧ -b^{293, 3}_0)
c  in CNF:
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_2
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_1
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_0
c  in DIMACS:
 23432  23433 -23434  586 -23435 0
 23432  23433 -23434  586 -23436 0
 23432  23433 -23434  586 -23437 0

c  0-1 --> -1
c    (-b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧ -p_586) -> ( b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0)
c  in CNF:
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨  b^{293, 3}_2
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_1
c     b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨  b^{293, 3}_0
c  in DIMACS:
 23432  23433  23434  586  23435 0
 23432  23433  23434  586 -23436 0
 23432  23433  23434  586  23437 0

c  -1-1 --> -2
c    ( b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧  b^{293, 2}_0 ∧ -p_586) -> ( b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0)
c  in CNF:
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨  b^{293, 3}_2
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨  b^{293, 3}_1
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨  p_586 ∨ -b^{293, 3}_0
c  in DIMACS:
-23432  23433 -23434  586  23435 0
-23432  23433 -23434  586  23436 0
-23432  23433 -23434  586 -23437 0

c  -2-1 --> break 
c    ( b^{293, 2}_2 ∧  b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧ -p_586) -> break
c  in CNF:
c    -b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨  b^{293, 2}_0 ∨  p_586 ∨ break
c  in DIMACS:
-23432 -23433  23434  586 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{293, 2}_2 ∧ -b^{293, 2}_1 ∧ -b^{293, 2}_0 ∧ true) 
c  in CNF:
c    -b^{293, 2}_2 ∨  b^{293, 2}_1 ∨  b^{293, 2}_0 ∨ false 
c  in DIMACS:
-23432  23433  23434  0

c  3 does not represent an automaton state.
c    -(-b^{293, 2}_2 ∧  b^{293, 2}_1 ∧  b^{293, 2}_0 ∧ true) 
c  in CNF:
c     b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ false 
c  in DIMACS:
 23432 -23433 -23434  0
c  -3 does not represent an automaton state.
c    -( b^{293, 2}_2 ∧  b^{293, 2}_1 ∧  b^{293, 2}_0 ∧ true) 
c  in CNF:
c    -b^{293, 2}_2 ∨ -b^{293, 2}_1 ∨ -b^{293, 2}_0 ∨ false 
c  in DIMACS:
-23432 -23433 -23434  0

c i = 3
c  -2+1 --> -1
c    ( b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧  p_879) -> ( b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧  b^{293, 4}_0)
c  in CNF:
c    -b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨  b^{293, 4}_2
c    -b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_1
c    -b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨  b^{293, 4}_0
c  in DIMACS:
-23435 -23436  23437 -879  23438 0
-23435 -23436  23437 -879 -23439 0
-23435 -23436  23437 -879  23440 0

c  -1+1 --> 0
c    ( b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0 ∧  p_879) -> (-b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧ -b^{293, 4}_0)
c  in CNF:
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_2
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_1
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_0
c  in DIMACS:
-23435  23436 -23437 -879 -23438 0
-23435  23436 -23437 -879 -23439 0
-23435  23436 -23437 -879 -23440 0

c  0+1 --> 1
c    (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧  p_879) -> (-b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧  b^{293, 4}_0)
c  in CNF:
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_2
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_1
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨  b^{293, 4}_0
c  in DIMACS:
 23435  23436  23437 -879 -23438 0
 23435  23436  23437 -879 -23439 0
 23435  23436  23437 -879  23440 0

c  1+1 --> 2
c    (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0 ∧  p_879) -> (-b^{293, 4}_2 ∧  b^{293, 4}_1 ∧ -b^{293, 4}_0)
c  in CNF:
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_2
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨  b^{293, 4}_1
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ -p_879 ∨ -b^{293, 4}_0
c  in DIMACS:
 23435  23436 -23437 -879 -23438 0
 23435  23436 -23437 -879  23439 0
 23435  23436 -23437 -879 -23440 0

c  2+1 --> break 
c    (-b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧  p_879) -> break
c  in CNF:
c     b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ -p_879 ∨ break
c  in DIMACS:
 23435 -23436  23437 -879 1162 0


c  2-1 --> 1
c    (-b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧ -p_879) -> (-b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧  b^{293, 4}_0)
c  in CNF:
c     b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_2
c     b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_1
c     b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨  b^{293, 4}_0
c  in DIMACS:
 23435 -23436  23437  879 -23438 0
 23435 -23436  23437  879 -23439 0
 23435 -23436  23437  879  23440 0

c  1-1 --> 0
c    (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0 ∧ -p_879) -> (-b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧ -b^{293, 4}_0)
c  in CNF:
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_2
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_1
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_0
c  in DIMACS:
 23435  23436 -23437  879 -23438 0
 23435  23436 -23437  879 -23439 0
 23435  23436 -23437  879 -23440 0

c  0-1 --> -1
c    (-b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧ -p_879) -> ( b^{293, 4}_2 ∧ -b^{293, 4}_1 ∧  b^{293, 4}_0)
c  in CNF:
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨  b^{293, 4}_2
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_1
c     b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨  b^{293, 4}_0
c  in DIMACS:
 23435  23436  23437  879  23438 0
 23435  23436  23437  879 -23439 0
 23435  23436  23437  879  23440 0

c  -1-1 --> -2
c    ( b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧  b^{293, 3}_0 ∧ -p_879) -> ( b^{293, 4}_2 ∧  b^{293, 4}_1 ∧ -b^{293, 4}_0)
c  in CNF:
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨  b^{293, 4}_2
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨  b^{293, 4}_1
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨  p_879 ∨ -b^{293, 4}_0
c  in DIMACS:
-23435  23436 -23437  879  23438 0
-23435  23436 -23437  879  23439 0
-23435  23436 -23437  879 -23440 0

c  -2-1 --> break 
c    ( b^{293, 3}_2 ∧  b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧ -p_879) -> break
c  in CNF:
c    -b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨  b^{293, 3}_0 ∨  p_879 ∨ break
c  in DIMACS:
-23435 -23436  23437  879 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{293, 3}_2 ∧ -b^{293, 3}_1 ∧ -b^{293, 3}_0 ∧ true) 
c  in CNF:
c    -b^{293, 3}_2 ∨  b^{293, 3}_1 ∨  b^{293, 3}_0 ∨ false 
c  in DIMACS:
-23435  23436  23437  0

c  3 does not represent an automaton state.
c    -(-b^{293, 3}_2 ∧  b^{293, 3}_1 ∧  b^{293, 3}_0 ∧ true) 
c  in CNF:
c     b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ false 
c  in DIMACS:
 23435 -23436 -23437  0
c  -3 does not represent an automaton state.
c    -( b^{293, 3}_2 ∧  b^{293, 3}_1 ∧  b^{293, 3}_0 ∧ true) 
c  in CNF:
c    -b^{293, 3}_2 ∨ -b^{293, 3}_1 ∨ -b^{293, 3}_0 ∨ false 
c  in DIMACS:
-23435 -23436 -23437  0

c INIT for k = 294
c    -b^{294, 1}_2
c    -b^{294, 1}_1
c    -b^{294, 1}_0
c  in DIMACS:
-23441 0
-23442 0
-23443 0

c Transitions for k = 294
c i = 1
c  -2+1 --> -1
c    ( b^{294, 1}_2 ∧  b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧  p_294) -> ( b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0)
c  in CNF:
c    -b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨  b^{294, 2}_2
c    -b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_1
c    -b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨  b^{294, 2}_0
c  in DIMACS:
-23441 -23442  23443 -294  23444 0
-23441 -23442  23443 -294 -23445 0
-23441 -23442  23443 -294  23446 0

c  -1+1 --> 0
c    ( b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧  b^{294, 1}_0 ∧  p_294) -> (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧ -b^{294, 2}_0)
c  in CNF:
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_2
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_1
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_0
c  in DIMACS:
-23441  23442 -23443 -294 -23444 0
-23441  23442 -23443 -294 -23445 0
-23441  23442 -23443 -294 -23446 0

c  0+1 --> 1
c    (-b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧  p_294) -> (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0)
c  in CNF:
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_2
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_1
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨  b^{294, 2}_0
c  in DIMACS:
 23441  23442  23443 -294 -23444 0
 23441  23442  23443 -294 -23445 0
 23441  23442  23443 -294  23446 0

c  1+1 --> 2
c    (-b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧  b^{294, 1}_0 ∧  p_294) -> (-b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0)
c  in CNF:
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_2
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨  b^{294, 2}_1
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ -p_294 ∨ -b^{294, 2}_0
c  in DIMACS:
 23441  23442 -23443 -294 -23444 0
 23441  23442 -23443 -294  23445 0
 23441  23442 -23443 -294 -23446 0

c  2+1 --> break 
c    (-b^{294, 1}_2 ∧  b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧  p_294) -> break
c  in CNF:
c     b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ -p_294 ∨ break
c  in DIMACS:
 23441 -23442  23443 -294 1162 0


c  2-1 --> 1
c    (-b^{294, 1}_2 ∧  b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧ -p_294) -> (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0)
c  in CNF:
c     b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_2
c     b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_1
c     b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨  b^{294, 2}_0
c  in DIMACS:
 23441 -23442  23443  294 -23444 0
 23441 -23442  23443  294 -23445 0
 23441 -23442  23443  294  23446 0

c  1-1 --> 0
c    (-b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧  b^{294, 1}_0 ∧ -p_294) -> (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧ -b^{294, 2}_0)
c  in CNF:
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_2
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_1
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_0
c  in DIMACS:
 23441  23442 -23443  294 -23444 0
 23441  23442 -23443  294 -23445 0
 23441  23442 -23443  294 -23446 0

c  0-1 --> -1
c    (-b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧ -p_294) -> ( b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0)
c  in CNF:
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨  b^{294, 2}_2
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_1
c     b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨  b^{294, 2}_0
c  in DIMACS:
 23441  23442  23443  294  23444 0
 23441  23442  23443  294 -23445 0
 23441  23442  23443  294  23446 0

c  -1-1 --> -2
c    ( b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧  b^{294, 1}_0 ∧ -p_294) -> ( b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0)
c  in CNF:
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨  b^{294, 2}_2
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨  b^{294, 2}_1
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨  p_294 ∨ -b^{294, 2}_0
c  in DIMACS:
-23441  23442 -23443  294  23444 0
-23441  23442 -23443  294  23445 0
-23441  23442 -23443  294 -23446 0

c  -2-1 --> break 
c    ( b^{294, 1}_2 ∧  b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧ -p_294) -> break
c  in CNF:
c    -b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨  b^{294, 1}_0 ∨  p_294 ∨ break
c  in DIMACS:
-23441 -23442  23443  294 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{294, 1}_2 ∧ -b^{294, 1}_1 ∧ -b^{294, 1}_0 ∧ true) 
c  in CNF:
c    -b^{294, 1}_2 ∨  b^{294, 1}_1 ∨  b^{294, 1}_0 ∨ false 
c  in DIMACS:
-23441  23442  23443  0

c  3 does not represent an automaton state.
c    -(-b^{294, 1}_2 ∧  b^{294, 1}_1 ∧  b^{294, 1}_0 ∧ true) 
c  in CNF:
c     b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ false 
c  in DIMACS:
 23441 -23442 -23443  0
c  -3 does not represent an automaton state.
c    -( b^{294, 1}_2 ∧  b^{294, 1}_1 ∧  b^{294, 1}_0 ∧ true) 
c  in CNF:
c    -b^{294, 1}_2 ∨ -b^{294, 1}_1 ∨ -b^{294, 1}_0 ∨ false 
c  in DIMACS:
-23441 -23442 -23443  0

c i = 2
c  -2+1 --> -1
c    ( b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧  p_588) -> ( b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0)
c  in CNF:
c    -b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨  b^{294, 3}_2
c    -b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_1
c    -b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨  b^{294, 3}_0
c  in DIMACS:
-23444 -23445  23446 -588  23447 0
-23444 -23445  23446 -588 -23448 0
-23444 -23445  23446 -588  23449 0

c  -1+1 --> 0
c    ( b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0 ∧  p_588) -> (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧ -b^{294, 3}_0)
c  in CNF:
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_2
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_1
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_0
c  in DIMACS:
-23444  23445 -23446 -588 -23447 0
-23444  23445 -23446 -588 -23448 0
-23444  23445 -23446 -588 -23449 0

c  0+1 --> 1
c    (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧  p_588) -> (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0)
c  in CNF:
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_2
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_1
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨  b^{294, 3}_0
c  in DIMACS:
 23444  23445  23446 -588 -23447 0
 23444  23445  23446 -588 -23448 0
 23444  23445  23446 -588  23449 0

c  1+1 --> 2
c    (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0 ∧  p_588) -> (-b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0)
c  in CNF:
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_2
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨  b^{294, 3}_1
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ -p_588 ∨ -b^{294, 3}_0
c  in DIMACS:
 23444  23445 -23446 -588 -23447 0
 23444  23445 -23446 -588  23448 0
 23444  23445 -23446 -588 -23449 0

c  2+1 --> break 
c    (-b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧  p_588) -> break
c  in CNF:
c     b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ -p_588 ∨ break
c  in DIMACS:
 23444 -23445  23446 -588 1162 0


c  2-1 --> 1
c    (-b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧ -p_588) -> (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0)
c  in CNF:
c     b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_2
c     b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_1
c     b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨  b^{294, 3}_0
c  in DIMACS:
 23444 -23445  23446  588 -23447 0
 23444 -23445  23446  588 -23448 0
 23444 -23445  23446  588  23449 0

c  1-1 --> 0
c    (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0 ∧ -p_588) -> (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧ -b^{294, 3}_0)
c  in CNF:
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_2
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_1
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_0
c  in DIMACS:
 23444  23445 -23446  588 -23447 0
 23444  23445 -23446  588 -23448 0
 23444  23445 -23446  588 -23449 0

c  0-1 --> -1
c    (-b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧ -p_588) -> ( b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0)
c  in CNF:
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨  b^{294, 3}_2
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_1
c     b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨  b^{294, 3}_0
c  in DIMACS:
 23444  23445  23446  588  23447 0
 23444  23445  23446  588 -23448 0
 23444  23445  23446  588  23449 0

c  -1-1 --> -2
c    ( b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧  b^{294, 2}_0 ∧ -p_588) -> ( b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0)
c  in CNF:
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨  b^{294, 3}_2
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨  b^{294, 3}_1
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨  p_588 ∨ -b^{294, 3}_0
c  in DIMACS:
-23444  23445 -23446  588  23447 0
-23444  23445 -23446  588  23448 0
-23444  23445 -23446  588 -23449 0

c  -2-1 --> break 
c    ( b^{294, 2}_2 ∧  b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧ -p_588) -> break
c  in CNF:
c    -b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨  b^{294, 2}_0 ∨  p_588 ∨ break
c  in DIMACS:
-23444 -23445  23446  588 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{294, 2}_2 ∧ -b^{294, 2}_1 ∧ -b^{294, 2}_0 ∧ true) 
c  in CNF:
c    -b^{294, 2}_2 ∨  b^{294, 2}_1 ∨  b^{294, 2}_0 ∨ false 
c  in DIMACS:
-23444  23445  23446  0

c  3 does not represent an automaton state.
c    -(-b^{294, 2}_2 ∧  b^{294, 2}_1 ∧  b^{294, 2}_0 ∧ true) 
c  in CNF:
c     b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ false 
c  in DIMACS:
 23444 -23445 -23446  0
c  -3 does not represent an automaton state.
c    -( b^{294, 2}_2 ∧  b^{294, 2}_1 ∧  b^{294, 2}_0 ∧ true) 
c  in CNF:
c    -b^{294, 2}_2 ∨ -b^{294, 2}_1 ∨ -b^{294, 2}_0 ∨ false 
c  in DIMACS:
-23444 -23445 -23446  0

c i = 3
c  -2+1 --> -1
c    ( b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧  p_882) -> ( b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧  b^{294, 4}_0)
c  in CNF:
c    -b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨  b^{294, 4}_2
c    -b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_1
c    -b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨  b^{294, 4}_0
c  in DIMACS:
-23447 -23448  23449 -882  23450 0
-23447 -23448  23449 -882 -23451 0
-23447 -23448  23449 -882  23452 0

c  -1+1 --> 0
c    ( b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0 ∧  p_882) -> (-b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧ -b^{294, 4}_0)
c  in CNF:
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_2
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_1
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_0
c  in DIMACS:
-23447  23448 -23449 -882 -23450 0
-23447  23448 -23449 -882 -23451 0
-23447  23448 -23449 -882 -23452 0

c  0+1 --> 1
c    (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧  p_882) -> (-b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧  b^{294, 4}_0)
c  in CNF:
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_2
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_1
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨  b^{294, 4}_0
c  in DIMACS:
 23447  23448  23449 -882 -23450 0
 23447  23448  23449 -882 -23451 0
 23447  23448  23449 -882  23452 0

c  1+1 --> 2
c    (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0 ∧  p_882) -> (-b^{294, 4}_2 ∧  b^{294, 4}_1 ∧ -b^{294, 4}_0)
c  in CNF:
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_2
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨  b^{294, 4}_1
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ -p_882 ∨ -b^{294, 4}_0
c  in DIMACS:
 23447  23448 -23449 -882 -23450 0
 23447  23448 -23449 -882  23451 0
 23447  23448 -23449 -882 -23452 0

c  2+1 --> break 
c    (-b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧  p_882) -> break
c  in CNF:
c     b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ -p_882 ∨ break
c  in DIMACS:
 23447 -23448  23449 -882 1162 0


c  2-1 --> 1
c    (-b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧ -p_882) -> (-b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧  b^{294, 4}_0)
c  in CNF:
c     b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_2
c     b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_1
c     b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨  b^{294, 4}_0
c  in DIMACS:
 23447 -23448  23449  882 -23450 0
 23447 -23448  23449  882 -23451 0
 23447 -23448  23449  882  23452 0

c  1-1 --> 0
c    (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0 ∧ -p_882) -> (-b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧ -b^{294, 4}_0)
c  in CNF:
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_2
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_1
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_0
c  in DIMACS:
 23447  23448 -23449  882 -23450 0
 23447  23448 -23449  882 -23451 0
 23447  23448 -23449  882 -23452 0

c  0-1 --> -1
c    (-b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧ -p_882) -> ( b^{294, 4}_2 ∧ -b^{294, 4}_1 ∧  b^{294, 4}_0)
c  in CNF:
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨  b^{294, 4}_2
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_1
c     b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨  b^{294, 4}_0
c  in DIMACS:
 23447  23448  23449  882  23450 0
 23447  23448  23449  882 -23451 0
 23447  23448  23449  882  23452 0

c  -1-1 --> -2
c    ( b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧  b^{294, 3}_0 ∧ -p_882) -> ( b^{294, 4}_2 ∧  b^{294, 4}_1 ∧ -b^{294, 4}_0)
c  in CNF:
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨  b^{294, 4}_2
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨  b^{294, 4}_1
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨  p_882 ∨ -b^{294, 4}_0
c  in DIMACS:
-23447  23448 -23449  882  23450 0
-23447  23448 -23449  882  23451 0
-23447  23448 -23449  882 -23452 0

c  -2-1 --> break 
c    ( b^{294, 3}_2 ∧  b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧ -p_882) -> break
c  in CNF:
c    -b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨  b^{294, 3}_0 ∨  p_882 ∨ break
c  in DIMACS:
-23447 -23448  23449  882 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{294, 3}_2 ∧ -b^{294, 3}_1 ∧ -b^{294, 3}_0 ∧ true) 
c  in CNF:
c    -b^{294, 3}_2 ∨  b^{294, 3}_1 ∨  b^{294, 3}_0 ∨ false 
c  in DIMACS:
-23447  23448  23449  0

c  3 does not represent an automaton state.
c    -(-b^{294, 3}_2 ∧  b^{294, 3}_1 ∧  b^{294, 3}_0 ∧ true) 
c  in CNF:
c     b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ false 
c  in DIMACS:
 23447 -23448 -23449  0
c  -3 does not represent an automaton state.
c    -( b^{294, 3}_2 ∧  b^{294, 3}_1 ∧  b^{294, 3}_0 ∧ true) 
c  in CNF:
c    -b^{294, 3}_2 ∨ -b^{294, 3}_1 ∨ -b^{294, 3}_0 ∨ false 
c  in DIMACS:
-23447 -23448 -23449  0

c INIT for k = 295
c    -b^{295, 1}_2
c    -b^{295, 1}_1
c    -b^{295, 1}_0
c  in DIMACS:
-23453 0
-23454 0
-23455 0

c Transitions for k = 295
c i = 1
c  -2+1 --> -1
c    ( b^{295, 1}_2 ∧  b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧  p_295) -> ( b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0)
c  in CNF:
c    -b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨  b^{295, 2}_2
c    -b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_1
c    -b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨  b^{295, 2}_0
c  in DIMACS:
-23453 -23454  23455 -295  23456 0
-23453 -23454  23455 -295 -23457 0
-23453 -23454  23455 -295  23458 0

c  -1+1 --> 0
c    ( b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧  b^{295, 1}_0 ∧  p_295) -> (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧ -b^{295, 2}_0)
c  in CNF:
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_2
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_1
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_0
c  in DIMACS:
-23453  23454 -23455 -295 -23456 0
-23453  23454 -23455 -295 -23457 0
-23453  23454 -23455 -295 -23458 0

c  0+1 --> 1
c    (-b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧  p_295) -> (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0)
c  in CNF:
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_2
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_1
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨  b^{295, 2}_0
c  in DIMACS:
 23453  23454  23455 -295 -23456 0
 23453  23454  23455 -295 -23457 0
 23453  23454  23455 -295  23458 0

c  1+1 --> 2
c    (-b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧  b^{295, 1}_0 ∧  p_295) -> (-b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0)
c  in CNF:
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_2
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨  b^{295, 2}_1
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ -p_295 ∨ -b^{295, 2}_0
c  in DIMACS:
 23453  23454 -23455 -295 -23456 0
 23453  23454 -23455 -295  23457 0
 23453  23454 -23455 -295 -23458 0

c  2+1 --> break 
c    (-b^{295, 1}_2 ∧  b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧  p_295) -> break
c  in CNF:
c     b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ -p_295 ∨ break
c  in DIMACS:
 23453 -23454  23455 -295 1162 0


c  2-1 --> 1
c    (-b^{295, 1}_2 ∧  b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧ -p_295) -> (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0)
c  in CNF:
c     b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_2
c     b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_1
c     b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨  b^{295, 2}_0
c  in DIMACS:
 23453 -23454  23455  295 -23456 0
 23453 -23454  23455  295 -23457 0
 23453 -23454  23455  295  23458 0

c  1-1 --> 0
c    (-b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧  b^{295, 1}_0 ∧ -p_295) -> (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧ -b^{295, 2}_0)
c  in CNF:
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_2
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_1
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_0
c  in DIMACS:
 23453  23454 -23455  295 -23456 0
 23453  23454 -23455  295 -23457 0
 23453  23454 -23455  295 -23458 0

c  0-1 --> -1
c    (-b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧ -p_295) -> ( b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0)
c  in CNF:
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨  b^{295, 2}_2
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_1
c     b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨  b^{295, 2}_0
c  in DIMACS:
 23453  23454  23455  295  23456 0
 23453  23454  23455  295 -23457 0
 23453  23454  23455  295  23458 0

c  -1-1 --> -2
c    ( b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧  b^{295, 1}_0 ∧ -p_295) -> ( b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0)
c  in CNF:
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨  b^{295, 2}_2
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨  b^{295, 2}_1
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨  p_295 ∨ -b^{295, 2}_0
c  in DIMACS:
-23453  23454 -23455  295  23456 0
-23453  23454 -23455  295  23457 0
-23453  23454 -23455  295 -23458 0

c  -2-1 --> break 
c    ( b^{295, 1}_2 ∧  b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧ -p_295) -> break
c  in CNF:
c    -b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨  b^{295, 1}_0 ∨  p_295 ∨ break
c  in DIMACS:
-23453 -23454  23455  295 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{295, 1}_2 ∧ -b^{295, 1}_1 ∧ -b^{295, 1}_0 ∧ true) 
c  in CNF:
c    -b^{295, 1}_2 ∨  b^{295, 1}_1 ∨  b^{295, 1}_0 ∨ false 
c  in DIMACS:
-23453  23454  23455  0

c  3 does not represent an automaton state.
c    -(-b^{295, 1}_2 ∧  b^{295, 1}_1 ∧  b^{295, 1}_0 ∧ true) 
c  in CNF:
c     b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ false 
c  in DIMACS:
 23453 -23454 -23455  0
c  -3 does not represent an automaton state.
c    -( b^{295, 1}_2 ∧  b^{295, 1}_1 ∧  b^{295, 1}_0 ∧ true) 
c  in CNF:
c    -b^{295, 1}_2 ∨ -b^{295, 1}_1 ∨ -b^{295, 1}_0 ∨ false 
c  in DIMACS:
-23453 -23454 -23455  0

c i = 2
c  -2+1 --> -1
c    ( b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧  p_590) -> ( b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0)
c  in CNF:
c    -b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨  b^{295, 3}_2
c    -b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_1
c    -b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨  b^{295, 3}_0
c  in DIMACS:
-23456 -23457  23458 -590  23459 0
-23456 -23457  23458 -590 -23460 0
-23456 -23457  23458 -590  23461 0

c  -1+1 --> 0
c    ( b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0 ∧  p_590) -> (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧ -b^{295, 3}_0)
c  in CNF:
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_2
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_1
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_0
c  in DIMACS:
-23456  23457 -23458 -590 -23459 0
-23456  23457 -23458 -590 -23460 0
-23456  23457 -23458 -590 -23461 0

c  0+1 --> 1
c    (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧  p_590) -> (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0)
c  in CNF:
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_2
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_1
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨  b^{295, 3}_0
c  in DIMACS:
 23456  23457  23458 -590 -23459 0
 23456  23457  23458 -590 -23460 0
 23456  23457  23458 -590  23461 0

c  1+1 --> 2
c    (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0 ∧  p_590) -> (-b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0)
c  in CNF:
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_2
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨  b^{295, 3}_1
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ -p_590 ∨ -b^{295, 3}_0
c  in DIMACS:
 23456  23457 -23458 -590 -23459 0
 23456  23457 -23458 -590  23460 0
 23456  23457 -23458 -590 -23461 0

c  2+1 --> break 
c    (-b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧  p_590) -> break
c  in CNF:
c     b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ -p_590 ∨ break
c  in DIMACS:
 23456 -23457  23458 -590 1162 0


c  2-1 --> 1
c    (-b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧ -p_590) -> (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0)
c  in CNF:
c     b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_2
c     b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_1
c     b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨  b^{295, 3}_0
c  in DIMACS:
 23456 -23457  23458  590 -23459 0
 23456 -23457  23458  590 -23460 0
 23456 -23457  23458  590  23461 0

c  1-1 --> 0
c    (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0 ∧ -p_590) -> (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧ -b^{295, 3}_0)
c  in CNF:
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_2
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_1
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_0
c  in DIMACS:
 23456  23457 -23458  590 -23459 0
 23456  23457 -23458  590 -23460 0
 23456  23457 -23458  590 -23461 0

c  0-1 --> -1
c    (-b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧ -p_590) -> ( b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0)
c  in CNF:
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨  b^{295, 3}_2
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_1
c     b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨  b^{295, 3}_0
c  in DIMACS:
 23456  23457  23458  590  23459 0
 23456  23457  23458  590 -23460 0
 23456  23457  23458  590  23461 0

c  -1-1 --> -2
c    ( b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧  b^{295, 2}_0 ∧ -p_590) -> ( b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0)
c  in CNF:
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨  b^{295, 3}_2
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨  b^{295, 3}_1
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨  p_590 ∨ -b^{295, 3}_0
c  in DIMACS:
-23456  23457 -23458  590  23459 0
-23456  23457 -23458  590  23460 0
-23456  23457 -23458  590 -23461 0

c  -2-1 --> break 
c    ( b^{295, 2}_2 ∧  b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧ -p_590) -> break
c  in CNF:
c    -b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨  b^{295, 2}_0 ∨  p_590 ∨ break
c  in DIMACS:
-23456 -23457  23458  590 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{295, 2}_2 ∧ -b^{295, 2}_1 ∧ -b^{295, 2}_0 ∧ true) 
c  in CNF:
c    -b^{295, 2}_2 ∨  b^{295, 2}_1 ∨  b^{295, 2}_0 ∨ false 
c  in DIMACS:
-23456  23457  23458  0

c  3 does not represent an automaton state.
c    -(-b^{295, 2}_2 ∧  b^{295, 2}_1 ∧  b^{295, 2}_0 ∧ true) 
c  in CNF:
c     b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ false 
c  in DIMACS:
 23456 -23457 -23458  0
c  -3 does not represent an automaton state.
c    -( b^{295, 2}_2 ∧  b^{295, 2}_1 ∧  b^{295, 2}_0 ∧ true) 
c  in CNF:
c    -b^{295, 2}_2 ∨ -b^{295, 2}_1 ∨ -b^{295, 2}_0 ∨ false 
c  in DIMACS:
-23456 -23457 -23458  0

c i = 3
c  -2+1 --> -1
c    ( b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧  p_885) -> ( b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧  b^{295, 4}_0)
c  in CNF:
c    -b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨  b^{295, 4}_2
c    -b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_1
c    -b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨  b^{295, 4}_0
c  in DIMACS:
-23459 -23460  23461 -885  23462 0
-23459 -23460  23461 -885 -23463 0
-23459 -23460  23461 -885  23464 0

c  -1+1 --> 0
c    ( b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0 ∧  p_885) -> (-b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧ -b^{295, 4}_0)
c  in CNF:
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_2
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_1
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_0
c  in DIMACS:
-23459  23460 -23461 -885 -23462 0
-23459  23460 -23461 -885 -23463 0
-23459  23460 -23461 -885 -23464 0

c  0+1 --> 1
c    (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧  p_885) -> (-b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧  b^{295, 4}_0)
c  in CNF:
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_2
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_1
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨  b^{295, 4}_0
c  in DIMACS:
 23459  23460  23461 -885 -23462 0
 23459  23460  23461 -885 -23463 0
 23459  23460  23461 -885  23464 0

c  1+1 --> 2
c    (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0 ∧  p_885) -> (-b^{295, 4}_2 ∧  b^{295, 4}_1 ∧ -b^{295, 4}_0)
c  in CNF:
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_2
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨  b^{295, 4}_1
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ -p_885 ∨ -b^{295, 4}_0
c  in DIMACS:
 23459  23460 -23461 -885 -23462 0
 23459  23460 -23461 -885  23463 0
 23459  23460 -23461 -885 -23464 0

c  2+1 --> break 
c    (-b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧  p_885) -> break
c  in CNF:
c     b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ -p_885 ∨ break
c  in DIMACS:
 23459 -23460  23461 -885 1162 0


c  2-1 --> 1
c    (-b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧ -p_885) -> (-b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧  b^{295, 4}_0)
c  in CNF:
c     b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_2
c     b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_1
c     b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨  b^{295, 4}_0
c  in DIMACS:
 23459 -23460  23461  885 -23462 0
 23459 -23460  23461  885 -23463 0
 23459 -23460  23461  885  23464 0

c  1-1 --> 0
c    (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0 ∧ -p_885) -> (-b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧ -b^{295, 4}_0)
c  in CNF:
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_2
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_1
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_0
c  in DIMACS:
 23459  23460 -23461  885 -23462 0
 23459  23460 -23461  885 -23463 0
 23459  23460 -23461  885 -23464 0

c  0-1 --> -1
c    (-b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧ -p_885) -> ( b^{295, 4}_2 ∧ -b^{295, 4}_1 ∧  b^{295, 4}_0)
c  in CNF:
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨  b^{295, 4}_2
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_1
c     b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨  b^{295, 4}_0
c  in DIMACS:
 23459  23460  23461  885  23462 0
 23459  23460  23461  885 -23463 0
 23459  23460  23461  885  23464 0

c  -1-1 --> -2
c    ( b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧  b^{295, 3}_0 ∧ -p_885) -> ( b^{295, 4}_2 ∧  b^{295, 4}_1 ∧ -b^{295, 4}_0)
c  in CNF:
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨  b^{295, 4}_2
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨  b^{295, 4}_1
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨  p_885 ∨ -b^{295, 4}_0
c  in DIMACS:
-23459  23460 -23461  885  23462 0
-23459  23460 -23461  885  23463 0
-23459  23460 -23461  885 -23464 0

c  -2-1 --> break 
c    ( b^{295, 3}_2 ∧  b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧ -p_885) -> break
c  in CNF:
c    -b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨  b^{295, 3}_0 ∨  p_885 ∨ break
c  in DIMACS:
-23459 -23460  23461  885 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{295, 3}_2 ∧ -b^{295, 3}_1 ∧ -b^{295, 3}_0 ∧ true) 
c  in CNF:
c    -b^{295, 3}_2 ∨  b^{295, 3}_1 ∨  b^{295, 3}_0 ∨ false 
c  in DIMACS:
-23459  23460  23461  0

c  3 does not represent an automaton state.
c    -(-b^{295, 3}_2 ∧  b^{295, 3}_1 ∧  b^{295, 3}_0 ∧ true) 
c  in CNF:
c     b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ false 
c  in DIMACS:
 23459 -23460 -23461  0
c  -3 does not represent an automaton state.
c    -( b^{295, 3}_2 ∧  b^{295, 3}_1 ∧  b^{295, 3}_0 ∧ true) 
c  in CNF:
c    -b^{295, 3}_2 ∨ -b^{295, 3}_1 ∨ -b^{295, 3}_0 ∨ false 
c  in DIMACS:
-23459 -23460 -23461  0

c INIT for k = 296
c    -b^{296, 1}_2
c    -b^{296, 1}_1
c    -b^{296, 1}_0
c  in DIMACS:
-23465 0
-23466 0
-23467 0

c Transitions for k = 296
c i = 1
c  -2+1 --> -1
c    ( b^{296, 1}_2 ∧  b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧  p_296) -> ( b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0)
c  in CNF:
c    -b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨  b^{296, 2}_2
c    -b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_1
c    -b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨  b^{296, 2}_0
c  in DIMACS:
-23465 -23466  23467 -296  23468 0
-23465 -23466  23467 -296 -23469 0
-23465 -23466  23467 -296  23470 0

c  -1+1 --> 0
c    ( b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧  b^{296, 1}_0 ∧  p_296) -> (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧ -b^{296, 2}_0)
c  in CNF:
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_2
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_1
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_0
c  in DIMACS:
-23465  23466 -23467 -296 -23468 0
-23465  23466 -23467 -296 -23469 0
-23465  23466 -23467 -296 -23470 0

c  0+1 --> 1
c    (-b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧  p_296) -> (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0)
c  in CNF:
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_2
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_1
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨  b^{296, 2}_0
c  in DIMACS:
 23465  23466  23467 -296 -23468 0
 23465  23466  23467 -296 -23469 0
 23465  23466  23467 -296  23470 0

c  1+1 --> 2
c    (-b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧  b^{296, 1}_0 ∧  p_296) -> (-b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0)
c  in CNF:
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_2
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨  b^{296, 2}_1
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ -p_296 ∨ -b^{296, 2}_0
c  in DIMACS:
 23465  23466 -23467 -296 -23468 0
 23465  23466 -23467 -296  23469 0
 23465  23466 -23467 -296 -23470 0

c  2+1 --> break 
c    (-b^{296, 1}_2 ∧  b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧  p_296) -> break
c  in CNF:
c     b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ -p_296 ∨ break
c  in DIMACS:
 23465 -23466  23467 -296 1162 0


c  2-1 --> 1
c    (-b^{296, 1}_2 ∧  b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧ -p_296) -> (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0)
c  in CNF:
c     b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_2
c     b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_1
c     b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨  b^{296, 2}_0
c  in DIMACS:
 23465 -23466  23467  296 -23468 0
 23465 -23466  23467  296 -23469 0
 23465 -23466  23467  296  23470 0

c  1-1 --> 0
c    (-b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧  b^{296, 1}_0 ∧ -p_296) -> (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧ -b^{296, 2}_0)
c  in CNF:
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_2
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_1
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_0
c  in DIMACS:
 23465  23466 -23467  296 -23468 0
 23465  23466 -23467  296 -23469 0
 23465  23466 -23467  296 -23470 0

c  0-1 --> -1
c    (-b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧ -p_296) -> ( b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0)
c  in CNF:
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨  b^{296, 2}_2
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_1
c     b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨  b^{296, 2}_0
c  in DIMACS:
 23465  23466  23467  296  23468 0
 23465  23466  23467  296 -23469 0
 23465  23466  23467  296  23470 0

c  -1-1 --> -2
c    ( b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧  b^{296, 1}_0 ∧ -p_296) -> ( b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0)
c  in CNF:
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨  b^{296, 2}_2
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨  b^{296, 2}_1
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨  p_296 ∨ -b^{296, 2}_0
c  in DIMACS:
-23465  23466 -23467  296  23468 0
-23465  23466 -23467  296  23469 0
-23465  23466 -23467  296 -23470 0

c  -2-1 --> break 
c    ( b^{296, 1}_2 ∧  b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧ -p_296) -> break
c  in CNF:
c    -b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨  b^{296, 1}_0 ∨  p_296 ∨ break
c  in DIMACS:
-23465 -23466  23467  296 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{296, 1}_2 ∧ -b^{296, 1}_1 ∧ -b^{296, 1}_0 ∧ true) 
c  in CNF:
c    -b^{296, 1}_2 ∨  b^{296, 1}_1 ∨  b^{296, 1}_0 ∨ false 
c  in DIMACS:
-23465  23466  23467  0

c  3 does not represent an automaton state.
c    -(-b^{296, 1}_2 ∧  b^{296, 1}_1 ∧  b^{296, 1}_0 ∧ true) 
c  in CNF:
c     b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ false 
c  in DIMACS:
 23465 -23466 -23467  0
c  -3 does not represent an automaton state.
c    -( b^{296, 1}_2 ∧  b^{296, 1}_1 ∧  b^{296, 1}_0 ∧ true) 
c  in CNF:
c    -b^{296, 1}_2 ∨ -b^{296, 1}_1 ∨ -b^{296, 1}_0 ∨ false 
c  in DIMACS:
-23465 -23466 -23467  0

c i = 2
c  -2+1 --> -1
c    ( b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧  p_592) -> ( b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0)
c  in CNF:
c    -b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨  b^{296, 3}_2
c    -b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_1
c    -b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨  b^{296, 3}_0
c  in DIMACS:
-23468 -23469  23470 -592  23471 0
-23468 -23469  23470 -592 -23472 0
-23468 -23469  23470 -592  23473 0

c  -1+1 --> 0
c    ( b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0 ∧  p_592) -> (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧ -b^{296, 3}_0)
c  in CNF:
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_2
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_1
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_0
c  in DIMACS:
-23468  23469 -23470 -592 -23471 0
-23468  23469 -23470 -592 -23472 0
-23468  23469 -23470 -592 -23473 0

c  0+1 --> 1
c    (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧  p_592) -> (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0)
c  in CNF:
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_2
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_1
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨  b^{296, 3}_0
c  in DIMACS:
 23468  23469  23470 -592 -23471 0
 23468  23469  23470 -592 -23472 0
 23468  23469  23470 -592  23473 0

c  1+1 --> 2
c    (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0 ∧  p_592) -> (-b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0)
c  in CNF:
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_2
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨  b^{296, 3}_1
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ -p_592 ∨ -b^{296, 3}_0
c  in DIMACS:
 23468  23469 -23470 -592 -23471 0
 23468  23469 -23470 -592  23472 0
 23468  23469 -23470 -592 -23473 0

c  2+1 --> break 
c    (-b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧  p_592) -> break
c  in CNF:
c     b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ -p_592 ∨ break
c  in DIMACS:
 23468 -23469  23470 -592 1162 0


c  2-1 --> 1
c    (-b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧ -p_592) -> (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0)
c  in CNF:
c     b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_2
c     b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_1
c     b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨  b^{296, 3}_0
c  in DIMACS:
 23468 -23469  23470  592 -23471 0
 23468 -23469  23470  592 -23472 0
 23468 -23469  23470  592  23473 0

c  1-1 --> 0
c    (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0 ∧ -p_592) -> (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧ -b^{296, 3}_0)
c  in CNF:
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_2
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_1
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_0
c  in DIMACS:
 23468  23469 -23470  592 -23471 0
 23468  23469 -23470  592 -23472 0
 23468  23469 -23470  592 -23473 0

c  0-1 --> -1
c    (-b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧ -p_592) -> ( b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0)
c  in CNF:
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨  b^{296, 3}_2
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_1
c     b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨  b^{296, 3}_0
c  in DIMACS:
 23468  23469  23470  592  23471 0
 23468  23469  23470  592 -23472 0
 23468  23469  23470  592  23473 0

c  -1-1 --> -2
c    ( b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧  b^{296, 2}_0 ∧ -p_592) -> ( b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0)
c  in CNF:
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨  b^{296, 3}_2
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨  b^{296, 3}_1
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨  p_592 ∨ -b^{296, 3}_0
c  in DIMACS:
-23468  23469 -23470  592  23471 0
-23468  23469 -23470  592  23472 0
-23468  23469 -23470  592 -23473 0

c  -2-1 --> break 
c    ( b^{296, 2}_2 ∧  b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧ -p_592) -> break
c  in CNF:
c    -b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨  b^{296, 2}_0 ∨  p_592 ∨ break
c  in DIMACS:
-23468 -23469  23470  592 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{296, 2}_2 ∧ -b^{296, 2}_1 ∧ -b^{296, 2}_0 ∧ true) 
c  in CNF:
c    -b^{296, 2}_2 ∨  b^{296, 2}_1 ∨  b^{296, 2}_0 ∨ false 
c  in DIMACS:
-23468  23469  23470  0

c  3 does not represent an automaton state.
c    -(-b^{296, 2}_2 ∧  b^{296, 2}_1 ∧  b^{296, 2}_0 ∧ true) 
c  in CNF:
c     b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ false 
c  in DIMACS:
 23468 -23469 -23470  0
c  -3 does not represent an automaton state.
c    -( b^{296, 2}_2 ∧  b^{296, 2}_1 ∧  b^{296, 2}_0 ∧ true) 
c  in CNF:
c    -b^{296, 2}_2 ∨ -b^{296, 2}_1 ∨ -b^{296, 2}_0 ∨ false 
c  in DIMACS:
-23468 -23469 -23470  0

c i = 3
c  -2+1 --> -1
c    ( b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧  p_888) -> ( b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧  b^{296, 4}_0)
c  in CNF:
c    -b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨  b^{296, 4}_2
c    -b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_1
c    -b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨  b^{296, 4}_0
c  in DIMACS:
-23471 -23472  23473 -888  23474 0
-23471 -23472  23473 -888 -23475 0
-23471 -23472  23473 -888  23476 0

c  -1+1 --> 0
c    ( b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0 ∧  p_888) -> (-b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧ -b^{296, 4}_0)
c  in CNF:
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_2
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_1
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_0
c  in DIMACS:
-23471  23472 -23473 -888 -23474 0
-23471  23472 -23473 -888 -23475 0
-23471  23472 -23473 -888 -23476 0

c  0+1 --> 1
c    (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧  p_888) -> (-b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧  b^{296, 4}_0)
c  in CNF:
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_2
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_1
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨  b^{296, 4}_0
c  in DIMACS:
 23471  23472  23473 -888 -23474 0
 23471  23472  23473 -888 -23475 0
 23471  23472  23473 -888  23476 0

c  1+1 --> 2
c    (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0 ∧  p_888) -> (-b^{296, 4}_2 ∧  b^{296, 4}_1 ∧ -b^{296, 4}_0)
c  in CNF:
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_2
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨  b^{296, 4}_1
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ -p_888 ∨ -b^{296, 4}_0
c  in DIMACS:
 23471  23472 -23473 -888 -23474 0
 23471  23472 -23473 -888  23475 0
 23471  23472 -23473 -888 -23476 0

c  2+1 --> break 
c    (-b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧  p_888) -> break
c  in CNF:
c     b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ -p_888 ∨ break
c  in DIMACS:
 23471 -23472  23473 -888 1162 0


c  2-1 --> 1
c    (-b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧ -p_888) -> (-b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧  b^{296, 4}_0)
c  in CNF:
c     b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_2
c     b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_1
c     b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨  b^{296, 4}_0
c  in DIMACS:
 23471 -23472  23473  888 -23474 0
 23471 -23472  23473  888 -23475 0
 23471 -23472  23473  888  23476 0

c  1-1 --> 0
c    (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0 ∧ -p_888) -> (-b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧ -b^{296, 4}_0)
c  in CNF:
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_2
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_1
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_0
c  in DIMACS:
 23471  23472 -23473  888 -23474 0
 23471  23472 -23473  888 -23475 0
 23471  23472 -23473  888 -23476 0

c  0-1 --> -1
c    (-b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧ -p_888) -> ( b^{296, 4}_2 ∧ -b^{296, 4}_1 ∧  b^{296, 4}_0)
c  in CNF:
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨  b^{296, 4}_2
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_1
c     b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨  b^{296, 4}_0
c  in DIMACS:
 23471  23472  23473  888  23474 0
 23471  23472  23473  888 -23475 0
 23471  23472  23473  888  23476 0

c  -1-1 --> -2
c    ( b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧  b^{296, 3}_0 ∧ -p_888) -> ( b^{296, 4}_2 ∧  b^{296, 4}_1 ∧ -b^{296, 4}_0)
c  in CNF:
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨  b^{296, 4}_2
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨  b^{296, 4}_1
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨  p_888 ∨ -b^{296, 4}_0
c  in DIMACS:
-23471  23472 -23473  888  23474 0
-23471  23472 -23473  888  23475 0
-23471  23472 -23473  888 -23476 0

c  -2-1 --> break 
c    ( b^{296, 3}_2 ∧  b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧ -p_888) -> break
c  in CNF:
c    -b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨  b^{296, 3}_0 ∨  p_888 ∨ break
c  in DIMACS:
-23471 -23472  23473  888 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{296, 3}_2 ∧ -b^{296, 3}_1 ∧ -b^{296, 3}_0 ∧ true) 
c  in CNF:
c    -b^{296, 3}_2 ∨  b^{296, 3}_1 ∨  b^{296, 3}_0 ∨ false 
c  in DIMACS:
-23471  23472  23473  0

c  3 does not represent an automaton state.
c    -(-b^{296, 3}_2 ∧  b^{296, 3}_1 ∧  b^{296, 3}_0 ∧ true) 
c  in CNF:
c     b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ false 
c  in DIMACS:
 23471 -23472 -23473  0
c  -3 does not represent an automaton state.
c    -( b^{296, 3}_2 ∧  b^{296, 3}_1 ∧  b^{296, 3}_0 ∧ true) 
c  in CNF:
c    -b^{296, 3}_2 ∨ -b^{296, 3}_1 ∨ -b^{296, 3}_0 ∨ false 
c  in DIMACS:
-23471 -23472 -23473  0

c INIT for k = 297
c    -b^{297, 1}_2
c    -b^{297, 1}_1
c    -b^{297, 1}_0
c  in DIMACS:
-23477 0
-23478 0
-23479 0

c Transitions for k = 297
c i = 1
c  -2+1 --> -1
c    ( b^{297, 1}_2 ∧  b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧  p_297) -> ( b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0)
c  in CNF:
c    -b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨  b^{297, 2}_2
c    -b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_1
c    -b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨  b^{297, 2}_0
c  in DIMACS:
-23477 -23478  23479 -297  23480 0
-23477 -23478  23479 -297 -23481 0
-23477 -23478  23479 -297  23482 0

c  -1+1 --> 0
c    ( b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧  b^{297, 1}_0 ∧  p_297) -> (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧ -b^{297, 2}_0)
c  in CNF:
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_2
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_1
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_0
c  in DIMACS:
-23477  23478 -23479 -297 -23480 0
-23477  23478 -23479 -297 -23481 0
-23477  23478 -23479 -297 -23482 0

c  0+1 --> 1
c    (-b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧  p_297) -> (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0)
c  in CNF:
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_2
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_1
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨  b^{297, 2}_0
c  in DIMACS:
 23477  23478  23479 -297 -23480 0
 23477  23478  23479 -297 -23481 0
 23477  23478  23479 -297  23482 0

c  1+1 --> 2
c    (-b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧  b^{297, 1}_0 ∧  p_297) -> (-b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0)
c  in CNF:
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_2
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨  b^{297, 2}_1
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ -p_297 ∨ -b^{297, 2}_0
c  in DIMACS:
 23477  23478 -23479 -297 -23480 0
 23477  23478 -23479 -297  23481 0
 23477  23478 -23479 -297 -23482 0

c  2+1 --> break 
c    (-b^{297, 1}_2 ∧  b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧  p_297) -> break
c  in CNF:
c     b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ -p_297 ∨ break
c  in DIMACS:
 23477 -23478  23479 -297 1162 0


c  2-1 --> 1
c    (-b^{297, 1}_2 ∧  b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧ -p_297) -> (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0)
c  in CNF:
c     b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_2
c     b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_1
c     b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨  b^{297, 2}_0
c  in DIMACS:
 23477 -23478  23479  297 -23480 0
 23477 -23478  23479  297 -23481 0
 23477 -23478  23479  297  23482 0

c  1-1 --> 0
c    (-b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧  b^{297, 1}_0 ∧ -p_297) -> (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧ -b^{297, 2}_0)
c  in CNF:
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_2
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_1
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_0
c  in DIMACS:
 23477  23478 -23479  297 -23480 0
 23477  23478 -23479  297 -23481 0
 23477  23478 -23479  297 -23482 0

c  0-1 --> -1
c    (-b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧ -p_297) -> ( b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0)
c  in CNF:
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨  b^{297, 2}_2
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_1
c     b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨  b^{297, 2}_0
c  in DIMACS:
 23477  23478  23479  297  23480 0
 23477  23478  23479  297 -23481 0
 23477  23478  23479  297  23482 0

c  -1-1 --> -2
c    ( b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧  b^{297, 1}_0 ∧ -p_297) -> ( b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0)
c  in CNF:
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨  b^{297, 2}_2
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨  b^{297, 2}_1
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨  p_297 ∨ -b^{297, 2}_0
c  in DIMACS:
-23477  23478 -23479  297  23480 0
-23477  23478 -23479  297  23481 0
-23477  23478 -23479  297 -23482 0

c  -2-1 --> break 
c    ( b^{297, 1}_2 ∧  b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧ -p_297) -> break
c  in CNF:
c    -b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨  b^{297, 1}_0 ∨  p_297 ∨ break
c  in DIMACS:
-23477 -23478  23479  297 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{297, 1}_2 ∧ -b^{297, 1}_1 ∧ -b^{297, 1}_0 ∧ true) 
c  in CNF:
c    -b^{297, 1}_2 ∨  b^{297, 1}_1 ∨  b^{297, 1}_0 ∨ false 
c  in DIMACS:
-23477  23478  23479  0

c  3 does not represent an automaton state.
c    -(-b^{297, 1}_2 ∧  b^{297, 1}_1 ∧  b^{297, 1}_0 ∧ true) 
c  in CNF:
c     b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ false 
c  in DIMACS:
 23477 -23478 -23479  0
c  -3 does not represent an automaton state.
c    -( b^{297, 1}_2 ∧  b^{297, 1}_1 ∧  b^{297, 1}_0 ∧ true) 
c  in CNF:
c    -b^{297, 1}_2 ∨ -b^{297, 1}_1 ∨ -b^{297, 1}_0 ∨ false 
c  in DIMACS:
-23477 -23478 -23479  0

c i = 2
c  -2+1 --> -1
c    ( b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧  p_594) -> ( b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0)
c  in CNF:
c    -b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨  b^{297, 3}_2
c    -b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_1
c    -b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨  b^{297, 3}_0
c  in DIMACS:
-23480 -23481  23482 -594  23483 0
-23480 -23481  23482 -594 -23484 0
-23480 -23481  23482 -594  23485 0

c  -1+1 --> 0
c    ( b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0 ∧  p_594) -> (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧ -b^{297, 3}_0)
c  in CNF:
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_2
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_1
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_0
c  in DIMACS:
-23480  23481 -23482 -594 -23483 0
-23480  23481 -23482 -594 -23484 0
-23480  23481 -23482 -594 -23485 0

c  0+1 --> 1
c    (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧  p_594) -> (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0)
c  in CNF:
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_2
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_1
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨  b^{297, 3}_0
c  in DIMACS:
 23480  23481  23482 -594 -23483 0
 23480  23481  23482 -594 -23484 0
 23480  23481  23482 -594  23485 0

c  1+1 --> 2
c    (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0 ∧  p_594) -> (-b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0)
c  in CNF:
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_2
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨  b^{297, 3}_1
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ -p_594 ∨ -b^{297, 3}_0
c  in DIMACS:
 23480  23481 -23482 -594 -23483 0
 23480  23481 -23482 -594  23484 0
 23480  23481 -23482 -594 -23485 0

c  2+1 --> break 
c    (-b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧  p_594) -> break
c  in CNF:
c     b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ -p_594 ∨ break
c  in DIMACS:
 23480 -23481  23482 -594 1162 0


c  2-1 --> 1
c    (-b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧ -p_594) -> (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0)
c  in CNF:
c     b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_2
c     b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_1
c     b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨  b^{297, 3}_0
c  in DIMACS:
 23480 -23481  23482  594 -23483 0
 23480 -23481  23482  594 -23484 0
 23480 -23481  23482  594  23485 0

c  1-1 --> 0
c    (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0 ∧ -p_594) -> (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧ -b^{297, 3}_0)
c  in CNF:
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_2
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_1
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_0
c  in DIMACS:
 23480  23481 -23482  594 -23483 0
 23480  23481 -23482  594 -23484 0
 23480  23481 -23482  594 -23485 0

c  0-1 --> -1
c    (-b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧ -p_594) -> ( b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0)
c  in CNF:
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨  b^{297, 3}_2
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_1
c     b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨  b^{297, 3}_0
c  in DIMACS:
 23480  23481  23482  594  23483 0
 23480  23481  23482  594 -23484 0
 23480  23481  23482  594  23485 0

c  -1-1 --> -2
c    ( b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧  b^{297, 2}_0 ∧ -p_594) -> ( b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0)
c  in CNF:
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨  b^{297, 3}_2
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨  b^{297, 3}_1
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨  p_594 ∨ -b^{297, 3}_0
c  in DIMACS:
-23480  23481 -23482  594  23483 0
-23480  23481 -23482  594  23484 0
-23480  23481 -23482  594 -23485 0

c  -2-1 --> break 
c    ( b^{297, 2}_2 ∧  b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧ -p_594) -> break
c  in CNF:
c    -b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨  b^{297, 2}_0 ∨  p_594 ∨ break
c  in DIMACS:
-23480 -23481  23482  594 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{297, 2}_2 ∧ -b^{297, 2}_1 ∧ -b^{297, 2}_0 ∧ true) 
c  in CNF:
c    -b^{297, 2}_2 ∨  b^{297, 2}_1 ∨  b^{297, 2}_0 ∨ false 
c  in DIMACS:
-23480  23481  23482  0

c  3 does not represent an automaton state.
c    -(-b^{297, 2}_2 ∧  b^{297, 2}_1 ∧  b^{297, 2}_0 ∧ true) 
c  in CNF:
c     b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ false 
c  in DIMACS:
 23480 -23481 -23482  0
c  -3 does not represent an automaton state.
c    -( b^{297, 2}_2 ∧  b^{297, 2}_1 ∧  b^{297, 2}_0 ∧ true) 
c  in CNF:
c    -b^{297, 2}_2 ∨ -b^{297, 2}_1 ∨ -b^{297, 2}_0 ∨ false 
c  in DIMACS:
-23480 -23481 -23482  0

c i = 3
c  -2+1 --> -1
c    ( b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧  p_891) -> ( b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧  b^{297, 4}_0)
c  in CNF:
c    -b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨  b^{297, 4}_2
c    -b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_1
c    -b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨  b^{297, 4}_0
c  in DIMACS:
-23483 -23484  23485 -891  23486 0
-23483 -23484  23485 -891 -23487 0
-23483 -23484  23485 -891  23488 0

c  -1+1 --> 0
c    ( b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0 ∧  p_891) -> (-b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧ -b^{297, 4}_0)
c  in CNF:
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_2
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_1
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_0
c  in DIMACS:
-23483  23484 -23485 -891 -23486 0
-23483  23484 -23485 -891 -23487 0
-23483  23484 -23485 -891 -23488 0

c  0+1 --> 1
c    (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧  p_891) -> (-b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧  b^{297, 4}_0)
c  in CNF:
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_2
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_1
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨  b^{297, 4}_0
c  in DIMACS:
 23483  23484  23485 -891 -23486 0
 23483  23484  23485 -891 -23487 0
 23483  23484  23485 -891  23488 0

c  1+1 --> 2
c    (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0 ∧  p_891) -> (-b^{297, 4}_2 ∧  b^{297, 4}_1 ∧ -b^{297, 4}_0)
c  in CNF:
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_2
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨  b^{297, 4}_1
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ -p_891 ∨ -b^{297, 4}_0
c  in DIMACS:
 23483  23484 -23485 -891 -23486 0
 23483  23484 -23485 -891  23487 0
 23483  23484 -23485 -891 -23488 0

c  2+1 --> break 
c    (-b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧  p_891) -> break
c  in CNF:
c     b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ -p_891 ∨ break
c  in DIMACS:
 23483 -23484  23485 -891 1162 0


c  2-1 --> 1
c    (-b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧ -p_891) -> (-b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧  b^{297, 4}_0)
c  in CNF:
c     b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_2
c     b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_1
c     b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨  b^{297, 4}_0
c  in DIMACS:
 23483 -23484  23485  891 -23486 0
 23483 -23484  23485  891 -23487 0
 23483 -23484  23485  891  23488 0

c  1-1 --> 0
c    (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0 ∧ -p_891) -> (-b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧ -b^{297, 4}_0)
c  in CNF:
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_2
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_1
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_0
c  in DIMACS:
 23483  23484 -23485  891 -23486 0
 23483  23484 -23485  891 -23487 0
 23483  23484 -23485  891 -23488 0

c  0-1 --> -1
c    (-b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧ -p_891) -> ( b^{297, 4}_2 ∧ -b^{297, 4}_1 ∧  b^{297, 4}_0)
c  in CNF:
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨  b^{297, 4}_2
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_1
c     b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨  b^{297, 4}_0
c  in DIMACS:
 23483  23484  23485  891  23486 0
 23483  23484  23485  891 -23487 0
 23483  23484  23485  891  23488 0

c  -1-1 --> -2
c    ( b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧  b^{297, 3}_0 ∧ -p_891) -> ( b^{297, 4}_2 ∧  b^{297, 4}_1 ∧ -b^{297, 4}_0)
c  in CNF:
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨  b^{297, 4}_2
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨  b^{297, 4}_1
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨  p_891 ∨ -b^{297, 4}_0
c  in DIMACS:
-23483  23484 -23485  891  23486 0
-23483  23484 -23485  891  23487 0
-23483  23484 -23485  891 -23488 0

c  -2-1 --> break 
c    ( b^{297, 3}_2 ∧  b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧ -p_891) -> break
c  in CNF:
c    -b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨  b^{297, 3}_0 ∨  p_891 ∨ break
c  in DIMACS:
-23483 -23484  23485  891 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{297, 3}_2 ∧ -b^{297, 3}_1 ∧ -b^{297, 3}_0 ∧ true) 
c  in CNF:
c    -b^{297, 3}_2 ∨  b^{297, 3}_1 ∨  b^{297, 3}_0 ∨ false 
c  in DIMACS:
-23483  23484  23485  0

c  3 does not represent an automaton state.
c    -(-b^{297, 3}_2 ∧  b^{297, 3}_1 ∧  b^{297, 3}_0 ∧ true) 
c  in CNF:
c     b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ false 
c  in DIMACS:
 23483 -23484 -23485  0
c  -3 does not represent an automaton state.
c    -( b^{297, 3}_2 ∧  b^{297, 3}_1 ∧  b^{297, 3}_0 ∧ true) 
c  in CNF:
c    -b^{297, 3}_2 ∨ -b^{297, 3}_1 ∨ -b^{297, 3}_0 ∨ false 
c  in DIMACS:
-23483 -23484 -23485  0

c INIT for k = 298
c    -b^{298, 1}_2
c    -b^{298, 1}_1
c    -b^{298, 1}_0
c  in DIMACS:
-23489 0
-23490 0
-23491 0

c Transitions for k = 298
c i = 1
c  -2+1 --> -1
c    ( b^{298, 1}_2 ∧  b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧  p_298) -> ( b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0)
c  in CNF:
c    -b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨  b^{298, 2}_2
c    -b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_1
c    -b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨  b^{298, 2}_0
c  in DIMACS:
-23489 -23490  23491 -298  23492 0
-23489 -23490  23491 -298 -23493 0
-23489 -23490  23491 -298  23494 0

c  -1+1 --> 0
c    ( b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧  b^{298, 1}_0 ∧  p_298) -> (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧ -b^{298, 2}_0)
c  in CNF:
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_2
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_1
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_0
c  in DIMACS:
-23489  23490 -23491 -298 -23492 0
-23489  23490 -23491 -298 -23493 0
-23489  23490 -23491 -298 -23494 0

c  0+1 --> 1
c    (-b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧  p_298) -> (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0)
c  in CNF:
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_2
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_1
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨  b^{298, 2}_0
c  in DIMACS:
 23489  23490  23491 -298 -23492 0
 23489  23490  23491 -298 -23493 0
 23489  23490  23491 -298  23494 0

c  1+1 --> 2
c    (-b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧  b^{298, 1}_0 ∧  p_298) -> (-b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0)
c  in CNF:
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_2
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨  b^{298, 2}_1
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ -p_298 ∨ -b^{298, 2}_0
c  in DIMACS:
 23489  23490 -23491 -298 -23492 0
 23489  23490 -23491 -298  23493 0
 23489  23490 -23491 -298 -23494 0

c  2+1 --> break 
c    (-b^{298, 1}_2 ∧  b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧  p_298) -> break
c  in CNF:
c     b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ -p_298 ∨ break
c  in DIMACS:
 23489 -23490  23491 -298 1162 0


c  2-1 --> 1
c    (-b^{298, 1}_2 ∧  b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧ -p_298) -> (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0)
c  in CNF:
c     b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_2
c     b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_1
c     b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨  b^{298, 2}_0
c  in DIMACS:
 23489 -23490  23491  298 -23492 0
 23489 -23490  23491  298 -23493 0
 23489 -23490  23491  298  23494 0

c  1-1 --> 0
c    (-b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧  b^{298, 1}_0 ∧ -p_298) -> (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧ -b^{298, 2}_0)
c  in CNF:
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_2
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_1
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_0
c  in DIMACS:
 23489  23490 -23491  298 -23492 0
 23489  23490 -23491  298 -23493 0
 23489  23490 -23491  298 -23494 0

c  0-1 --> -1
c    (-b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧ -p_298) -> ( b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0)
c  in CNF:
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨  b^{298, 2}_2
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_1
c     b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨  b^{298, 2}_0
c  in DIMACS:
 23489  23490  23491  298  23492 0
 23489  23490  23491  298 -23493 0
 23489  23490  23491  298  23494 0

c  -1-1 --> -2
c    ( b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧  b^{298, 1}_0 ∧ -p_298) -> ( b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0)
c  in CNF:
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨  b^{298, 2}_2
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨  b^{298, 2}_1
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨  p_298 ∨ -b^{298, 2}_0
c  in DIMACS:
-23489  23490 -23491  298  23492 0
-23489  23490 -23491  298  23493 0
-23489  23490 -23491  298 -23494 0

c  -2-1 --> break 
c    ( b^{298, 1}_2 ∧  b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧ -p_298) -> break
c  in CNF:
c    -b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨  b^{298, 1}_0 ∨  p_298 ∨ break
c  in DIMACS:
-23489 -23490  23491  298 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{298, 1}_2 ∧ -b^{298, 1}_1 ∧ -b^{298, 1}_0 ∧ true) 
c  in CNF:
c    -b^{298, 1}_2 ∨  b^{298, 1}_1 ∨  b^{298, 1}_0 ∨ false 
c  in DIMACS:
-23489  23490  23491  0

c  3 does not represent an automaton state.
c    -(-b^{298, 1}_2 ∧  b^{298, 1}_1 ∧  b^{298, 1}_0 ∧ true) 
c  in CNF:
c     b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ false 
c  in DIMACS:
 23489 -23490 -23491  0
c  -3 does not represent an automaton state.
c    -( b^{298, 1}_2 ∧  b^{298, 1}_1 ∧  b^{298, 1}_0 ∧ true) 
c  in CNF:
c    -b^{298, 1}_2 ∨ -b^{298, 1}_1 ∨ -b^{298, 1}_0 ∨ false 
c  in DIMACS:
-23489 -23490 -23491  0

c i = 2
c  -2+1 --> -1
c    ( b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧  p_596) -> ( b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0)
c  in CNF:
c    -b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨  b^{298, 3}_2
c    -b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_1
c    -b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨  b^{298, 3}_0
c  in DIMACS:
-23492 -23493  23494 -596  23495 0
-23492 -23493  23494 -596 -23496 0
-23492 -23493  23494 -596  23497 0

c  -1+1 --> 0
c    ( b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0 ∧  p_596) -> (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧ -b^{298, 3}_0)
c  in CNF:
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_2
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_1
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_0
c  in DIMACS:
-23492  23493 -23494 -596 -23495 0
-23492  23493 -23494 -596 -23496 0
-23492  23493 -23494 -596 -23497 0

c  0+1 --> 1
c    (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧  p_596) -> (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0)
c  in CNF:
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_2
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_1
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨  b^{298, 3}_0
c  in DIMACS:
 23492  23493  23494 -596 -23495 0
 23492  23493  23494 -596 -23496 0
 23492  23493  23494 -596  23497 0

c  1+1 --> 2
c    (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0 ∧  p_596) -> (-b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0)
c  in CNF:
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_2
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨  b^{298, 3}_1
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ -p_596 ∨ -b^{298, 3}_0
c  in DIMACS:
 23492  23493 -23494 -596 -23495 0
 23492  23493 -23494 -596  23496 0
 23492  23493 -23494 -596 -23497 0

c  2+1 --> break 
c    (-b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧  p_596) -> break
c  in CNF:
c     b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ -p_596 ∨ break
c  in DIMACS:
 23492 -23493  23494 -596 1162 0


c  2-1 --> 1
c    (-b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧ -p_596) -> (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0)
c  in CNF:
c     b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_2
c     b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_1
c     b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨  b^{298, 3}_0
c  in DIMACS:
 23492 -23493  23494  596 -23495 0
 23492 -23493  23494  596 -23496 0
 23492 -23493  23494  596  23497 0

c  1-1 --> 0
c    (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0 ∧ -p_596) -> (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧ -b^{298, 3}_0)
c  in CNF:
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_2
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_1
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_0
c  in DIMACS:
 23492  23493 -23494  596 -23495 0
 23492  23493 -23494  596 -23496 0
 23492  23493 -23494  596 -23497 0

c  0-1 --> -1
c    (-b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧ -p_596) -> ( b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0)
c  in CNF:
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨  b^{298, 3}_2
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_1
c     b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨  b^{298, 3}_0
c  in DIMACS:
 23492  23493  23494  596  23495 0
 23492  23493  23494  596 -23496 0
 23492  23493  23494  596  23497 0

c  -1-1 --> -2
c    ( b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧  b^{298, 2}_0 ∧ -p_596) -> ( b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0)
c  in CNF:
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨  b^{298, 3}_2
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨  b^{298, 3}_1
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨  p_596 ∨ -b^{298, 3}_0
c  in DIMACS:
-23492  23493 -23494  596  23495 0
-23492  23493 -23494  596  23496 0
-23492  23493 -23494  596 -23497 0

c  -2-1 --> break 
c    ( b^{298, 2}_2 ∧  b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧ -p_596) -> break
c  in CNF:
c    -b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨  b^{298, 2}_0 ∨  p_596 ∨ break
c  in DIMACS:
-23492 -23493  23494  596 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{298, 2}_2 ∧ -b^{298, 2}_1 ∧ -b^{298, 2}_0 ∧ true) 
c  in CNF:
c    -b^{298, 2}_2 ∨  b^{298, 2}_1 ∨  b^{298, 2}_0 ∨ false 
c  in DIMACS:
-23492  23493  23494  0

c  3 does not represent an automaton state.
c    -(-b^{298, 2}_2 ∧  b^{298, 2}_1 ∧  b^{298, 2}_0 ∧ true) 
c  in CNF:
c     b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ false 
c  in DIMACS:
 23492 -23493 -23494  0
c  -3 does not represent an automaton state.
c    -( b^{298, 2}_2 ∧  b^{298, 2}_1 ∧  b^{298, 2}_0 ∧ true) 
c  in CNF:
c    -b^{298, 2}_2 ∨ -b^{298, 2}_1 ∨ -b^{298, 2}_0 ∨ false 
c  in DIMACS:
-23492 -23493 -23494  0

c i = 3
c  -2+1 --> -1
c    ( b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧  p_894) -> ( b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧  b^{298, 4}_0)
c  in CNF:
c    -b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨  b^{298, 4}_2
c    -b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_1
c    -b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨  b^{298, 4}_0
c  in DIMACS:
-23495 -23496  23497 -894  23498 0
-23495 -23496  23497 -894 -23499 0
-23495 -23496  23497 -894  23500 0

c  -1+1 --> 0
c    ( b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0 ∧  p_894) -> (-b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧ -b^{298, 4}_0)
c  in CNF:
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_2
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_1
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_0
c  in DIMACS:
-23495  23496 -23497 -894 -23498 0
-23495  23496 -23497 -894 -23499 0
-23495  23496 -23497 -894 -23500 0

c  0+1 --> 1
c    (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧  p_894) -> (-b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧  b^{298, 4}_0)
c  in CNF:
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_2
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_1
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨  b^{298, 4}_0
c  in DIMACS:
 23495  23496  23497 -894 -23498 0
 23495  23496  23497 -894 -23499 0
 23495  23496  23497 -894  23500 0

c  1+1 --> 2
c    (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0 ∧  p_894) -> (-b^{298, 4}_2 ∧  b^{298, 4}_1 ∧ -b^{298, 4}_0)
c  in CNF:
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_2
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨  b^{298, 4}_1
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ -p_894 ∨ -b^{298, 4}_0
c  in DIMACS:
 23495  23496 -23497 -894 -23498 0
 23495  23496 -23497 -894  23499 0
 23495  23496 -23497 -894 -23500 0

c  2+1 --> break 
c    (-b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧  p_894) -> break
c  in CNF:
c     b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ -p_894 ∨ break
c  in DIMACS:
 23495 -23496  23497 -894 1162 0


c  2-1 --> 1
c    (-b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧ -p_894) -> (-b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧  b^{298, 4}_0)
c  in CNF:
c     b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_2
c     b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_1
c     b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨  b^{298, 4}_0
c  in DIMACS:
 23495 -23496  23497  894 -23498 0
 23495 -23496  23497  894 -23499 0
 23495 -23496  23497  894  23500 0

c  1-1 --> 0
c    (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0 ∧ -p_894) -> (-b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧ -b^{298, 4}_0)
c  in CNF:
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_2
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_1
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_0
c  in DIMACS:
 23495  23496 -23497  894 -23498 0
 23495  23496 -23497  894 -23499 0
 23495  23496 -23497  894 -23500 0

c  0-1 --> -1
c    (-b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧ -p_894) -> ( b^{298, 4}_2 ∧ -b^{298, 4}_1 ∧  b^{298, 4}_0)
c  in CNF:
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨  b^{298, 4}_2
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_1
c     b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨  b^{298, 4}_0
c  in DIMACS:
 23495  23496  23497  894  23498 0
 23495  23496  23497  894 -23499 0
 23495  23496  23497  894  23500 0

c  -1-1 --> -2
c    ( b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧  b^{298, 3}_0 ∧ -p_894) -> ( b^{298, 4}_2 ∧  b^{298, 4}_1 ∧ -b^{298, 4}_0)
c  in CNF:
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨  b^{298, 4}_2
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨  b^{298, 4}_1
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨  p_894 ∨ -b^{298, 4}_0
c  in DIMACS:
-23495  23496 -23497  894  23498 0
-23495  23496 -23497  894  23499 0
-23495  23496 -23497  894 -23500 0

c  -2-1 --> break 
c    ( b^{298, 3}_2 ∧  b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧ -p_894) -> break
c  in CNF:
c    -b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨  b^{298, 3}_0 ∨  p_894 ∨ break
c  in DIMACS:
-23495 -23496  23497  894 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{298, 3}_2 ∧ -b^{298, 3}_1 ∧ -b^{298, 3}_0 ∧ true) 
c  in CNF:
c    -b^{298, 3}_2 ∨  b^{298, 3}_1 ∨  b^{298, 3}_0 ∨ false 
c  in DIMACS:
-23495  23496  23497  0

c  3 does not represent an automaton state.
c    -(-b^{298, 3}_2 ∧  b^{298, 3}_1 ∧  b^{298, 3}_0 ∧ true) 
c  in CNF:
c     b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ false 
c  in DIMACS:
 23495 -23496 -23497  0
c  -3 does not represent an automaton state.
c    -( b^{298, 3}_2 ∧  b^{298, 3}_1 ∧  b^{298, 3}_0 ∧ true) 
c  in CNF:
c    -b^{298, 3}_2 ∨ -b^{298, 3}_1 ∨ -b^{298, 3}_0 ∨ false 
c  in DIMACS:
-23495 -23496 -23497  0

c INIT for k = 299
c    -b^{299, 1}_2
c    -b^{299, 1}_1
c    -b^{299, 1}_0
c  in DIMACS:
-23501 0
-23502 0
-23503 0

c Transitions for k = 299
c i = 1
c  -2+1 --> -1
c    ( b^{299, 1}_2 ∧  b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧  p_299) -> ( b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0)
c  in CNF:
c    -b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨  b^{299, 2}_2
c    -b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_1
c    -b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨  b^{299, 2}_0
c  in DIMACS:
-23501 -23502  23503 -299  23504 0
-23501 -23502  23503 -299 -23505 0
-23501 -23502  23503 -299  23506 0

c  -1+1 --> 0
c    ( b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧  b^{299, 1}_0 ∧  p_299) -> (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧ -b^{299, 2}_0)
c  in CNF:
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_2
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_1
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_0
c  in DIMACS:
-23501  23502 -23503 -299 -23504 0
-23501  23502 -23503 -299 -23505 0
-23501  23502 -23503 -299 -23506 0

c  0+1 --> 1
c    (-b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧  p_299) -> (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0)
c  in CNF:
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_2
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_1
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨  b^{299, 2}_0
c  in DIMACS:
 23501  23502  23503 -299 -23504 0
 23501  23502  23503 -299 -23505 0
 23501  23502  23503 -299  23506 0

c  1+1 --> 2
c    (-b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧  b^{299, 1}_0 ∧  p_299) -> (-b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0)
c  in CNF:
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_2
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨  b^{299, 2}_1
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ -p_299 ∨ -b^{299, 2}_0
c  in DIMACS:
 23501  23502 -23503 -299 -23504 0
 23501  23502 -23503 -299  23505 0
 23501  23502 -23503 -299 -23506 0

c  2+1 --> break 
c    (-b^{299, 1}_2 ∧  b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧  p_299) -> break
c  in CNF:
c     b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ -p_299 ∨ break
c  in DIMACS:
 23501 -23502  23503 -299 1162 0


c  2-1 --> 1
c    (-b^{299, 1}_2 ∧  b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧ -p_299) -> (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0)
c  in CNF:
c     b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_2
c     b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_1
c     b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨  b^{299, 2}_0
c  in DIMACS:
 23501 -23502  23503  299 -23504 0
 23501 -23502  23503  299 -23505 0
 23501 -23502  23503  299  23506 0

c  1-1 --> 0
c    (-b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧  b^{299, 1}_0 ∧ -p_299) -> (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧ -b^{299, 2}_0)
c  in CNF:
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_2
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_1
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_0
c  in DIMACS:
 23501  23502 -23503  299 -23504 0
 23501  23502 -23503  299 -23505 0
 23501  23502 -23503  299 -23506 0

c  0-1 --> -1
c    (-b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧ -p_299) -> ( b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0)
c  in CNF:
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨  b^{299, 2}_2
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_1
c     b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨  b^{299, 2}_0
c  in DIMACS:
 23501  23502  23503  299  23504 0
 23501  23502  23503  299 -23505 0
 23501  23502  23503  299  23506 0

c  -1-1 --> -2
c    ( b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧  b^{299, 1}_0 ∧ -p_299) -> ( b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0)
c  in CNF:
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨  b^{299, 2}_2
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨  b^{299, 2}_1
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨  p_299 ∨ -b^{299, 2}_0
c  in DIMACS:
-23501  23502 -23503  299  23504 0
-23501  23502 -23503  299  23505 0
-23501  23502 -23503  299 -23506 0

c  -2-1 --> break 
c    ( b^{299, 1}_2 ∧  b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧ -p_299) -> break
c  in CNF:
c    -b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨  b^{299, 1}_0 ∨  p_299 ∨ break
c  in DIMACS:
-23501 -23502  23503  299 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{299, 1}_2 ∧ -b^{299, 1}_1 ∧ -b^{299, 1}_0 ∧ true) 
c  in CNF:
c    -b^{299, 1}_2 ∨  b^{299, 1}_1 ∨  b^{299, 1}_0 ∨ false 
c  in DIMACS:
-23501  23502  23503  0

c  3 does not represent an automaton state.
c    -(-b^{299, 1}_2 ∧  b^{299, 1}_1 ∧  b^{299, 1}_0 ∧ true) 
c  in CNF:
c     b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ false 
c  in DIMACS:
 23501 -23502 -23503  0
c  -3 does not represent an automaton state.
c    -( b^{299, 1}_2 ∧  b^{299, 1}_1 ∧  b^{299, 1}_0 ∧ true) 
c  in CNF:
c    -b^{299, 1}_2 ∨ -b^{299, 1}_1 ∨ -b^{299, 1}_0 ∨ false 
c  in DIMACS:
-23501 -23502 -23503  0

c i = 2
c  -2+1 --> -1
c    ( b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧  p_598) -> ( b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0)
c  in CNF:
c    -b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨  b^{299, 3}_2
c    -b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_1
c    -b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨  b^{299, 3}_0
c  in DIMACS:
-23504 -23505  23506 -598  23507 0
-23504 -23505  23506 -598 -23508 0
-23504 -23505  23506 -598  23509 0

c  -1+1 --> 0
c    ( b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0 ∧  p_598) -> (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧ -b^{299, 3}_0)
c  in CNF:
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_2
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_1
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_0
c  in DIMACS:
-23504  23505 -23506 -598 -23507 0
-23504  23505 -23506 -598 -23508 0
-23504  23505 -23506 -598 -23509 0

c  0+1 --> 1
c    (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧  p_598) -> (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0)
c  in CNF:
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_2
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_1
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨  b^{299, 3}_0
c  in DIMACS:
 23504  23505  23506 -598 -23507 0
 23504  23505  23506 -598 -23508 0
 23504  23505  23506 -598  23509 0

c  1+1 --> 2
c    (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0 ∧  p_598) -> (-b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0)
c  in CNF:
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_2
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨  b^{299, 3}_1
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ -p_598 ∨ -b^{299, 3}_0
c  in DIMACS:
 23504  23505 -23506 -598 -23507 0
 23504  23505 -23506 -598  23508 0
 23504  23505 -23506 -598 -23509 0

c  2+1 --> break 
c    (-b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧  p_598) -> break
c  in CNF:
c     b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ -p_598 ∨ break
c  in DIMACS:
 23504 -23505  23506 -598 1162 0


c  2-1 --> 1
c    (-b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧ -p_598) -> (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0)
c  in CNF:
c     b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_2
c     b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_1
c     b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨  b^{299, 3}_0
c  in DIMACS:
 23504 -23505  23506  598 -23507 0
 23504 -23505  23506  598 -23508 0
 23504 -23505  23506  598  23509 0

c  1-1 --> 0
c    (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0 ∧ -p_598) -> (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧ -b^{299, 3}_0)
c  in CNF:
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_2
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_1
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_0
c  in DIMACS:
 23504  23505 -23506  598 -23507 0
 23504  23505 -23506  598 -23508 0
 23504  23505 -23506  598 -23509 0

c  0-1 --> -1
c    (-b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧ -p_598) -> ( b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0)
c  in CNF:
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨  b^{299, 3}_2
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_1
c     b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨  b^{299, 3}_0
c  in DIMACS:
 23504  23505  23506  598  23507 0
 23504  23505  23506  598 -23508 0
 23504  23505  23506  598  23509 0

c  -1-1 --> -2
c    ( b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧  b^{299, 2}_0 ∧ -p_598) -> ( b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0)
c  in CNF:
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨  b^{299, 3}_2
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨  b^{299, 3}_1
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨  p_598 ∨ -b^{299, 3}_0
c  in DIMACS:
-23504  23505 -23506  598  23507 0
-23504  23505 -23506  598  23508 0
-23504  23505 -23506  598 -23509 0

c  -2-1 --> break 
c    ( b^{299, 2}_2 ∧  b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧ -p_598) -> break
c  in CNF:
c    -b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨  b^{299, 2}_0 ∨  p_598 ∨ break
c  in DIMACS:
-23504 -23505  23506  598 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{299, 2}_2 ∧ -b^{299, 2}_1 ∧ -b^{299, 2}_0 ∧ true) 
c  in CNF:
c    -b^{299, 2}_2 ∨  b^{299, 2}_1 ∨  b^{299, 2}_0 ∨ false 
c  in DIMACS:
-23504  23505  23506  0

c  3 does not represent an automaton state.
c    -(-b^{299, 2}_2 ∧  b^{299, 2}_1 ∧  b^{299, 2}_0 ∧ true) 
c  in CNF:
c     b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ false 
c  in DIMACS:
 23504 -23505 -23506  0
c  -3 does not represent an automaton state.
c    -( b^{299, 2}_2 ∧  b^{299, 2}_1 ∧  b^{299, 2}_0 ∧ true) 
c  in CNF:
c    -b^{299, 2}_2 ∨ -b^{299, 2}_1 ∨ -b^{299, 2}_0 ∨ false 
c  in DIMACS:
-23504 -23505 -23506  0

c i = 3
c  -2+1 --> -1
c    ( b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧  p_897) -> ( b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧  b^{299, 4}_0)
c  in CNF:
c    -b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨  b^{299, 4}_2
c    -b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_1
c    -b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨  b^{299, 4}_0
c  in DIMACS:
-23507 -23508  23509 -897  23510 0
-23507 -23508  23509 -897 -23511 0
-23507 -23508  23509 -897  23512 0

c  -1+1 --> 0
c    ( b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0 ∧  p_897) -> (-b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧ -b^{299, 4}_0)
c  in CNF:
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_2
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_1
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_0
c  in DIMACS:
-23507  23508 -23509 -897 -23510 0
-23507  23508 -23509 -897 -23511 0
-23507  23508 -23509 -897 -23512 0

c  0+1 --> 1
c    (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧  p_897) -> (-b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧  b^{299, 4}_0)
c  in CNF:
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_2
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_1
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨  b^{299, 4}_0
c  in DIMACS:
 23507  23508  23509 -897 -23510 0
 23507  23508  23509 -897 -23511 0
 23507  23508  23509 -897  23512 0

c  1+1 --> 2
c    (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0 ∧  p_897) -> (-b^{299, 4}_2 ∧  b^{299, 4}_1 ∧ -b^{299, 4}_0)
c  in CNF:
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_2
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨  b^{299, 4}_1
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ -p_897 ∨ -b^{299, 4}_0
c  in DIMACS:
 23507  23508 -23509 -897 -23510 0
 23507  23508 -23509 -897  23511 0
 23507  23508 -23509 -897 -23512 0

c  2+1 --> break 
c    (-b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧  p_897) -> break
c  in CNF:
c     b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ -p_897 ∨ break
c  in DIMACS:
 23507 -23508  23509 -897 1162 0


c  2-1 --> 1
c    (-b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧ -p_897) -> (-b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧  b^{299, 4}_0)
c  in CNF:
c     b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_2
c     b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_1
c     b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨  b^{299, 4}_0
c  in DIMACS:
 23507 -23508  23509  897 -23510 0
 23507 -23508  23509  897 -23511 0
 23507 -23508  23509  897  23512 0

c  1-1 --> 0
c    (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0 ∧ -p_897) -> (-b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧ -b^{299, 4}_0)
c  in CNF:
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_2
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_1
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_0
c  in DIMACS:
 23507  23508 -23509  897 -23510 0
 23507  23508 -23509  897 -23511 0
 23507  23508 -23509  897 -23512 0

c  0-1 --> -1
c    (-b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧ -p_897) -> ( b^{299, 4}_2 ∧ -b^{299, 4}_1 ∧  b^{299, 4}_0)
c  in CNF:
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨  b^{299, 4}_2
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_1
c     b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨  b^{299, 4}_0
c  in DIMACS:
 23507  23508  23509  897  23510 0
 23507  23508  23509  897 -23511 0
 23507  23508  23509  897  23512 0

c  -1-1 --> -2
c    ( b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧  b^{299, 3}_0 ∧ -p_897) -> ( b^{299, 4}_2 ∧  b^{299, 4}_1 ∧ -b^{299, 4}_0)
c  in CNF:
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨  b^{299, 4}_2
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨  b^{299, 4}_1
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨  p_897 ∨ -b^{299, 4}_0
c  in DIMACS:
-23507  23508 -23509  897  23510 0
-23507  23508 -23509  897  23511 0
-23507  23508 -23509  897 -23512 0

c  -2-1 --> break 
c    ( b^{299, 3}_2 ∧  b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧ -p_897) -> break
c  in CNF:
c    -b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨  b^{299, 3}_0 ∨  p_897 ∨ break
c  in DIMACS:
-23507 -23508  23509  897 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{299, 3}_2 ∧ -b^{299, 3}_1 ∧ -b^{299, 3}_0 ∧ true) 
c  in CNF:
c    -b^{299, 3}_2 ∨  b^{299, 3}_1 ∨  b^{299, 3}_0 ∨ false 
c  in DIMACS:
-23507  23508  23509  0

c  3 does not represent an automaton state.
c    -(-b^{299, 3}_2 ∧  b^{299, 3}_1 ∧  b^{299, 3}_0 ∧ true) 
c  in CNF:
c     b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ false 
c  in DIMACS:
 23507 -23508 -23509  0
c  -3 does not represent an automaton state.
c    -( b^{299, 3}_2 ∧  b^{299, 3}_1 ∧  b^{299, 3}_0 ∧ true) 
c  in CNF:
c    -b^{299, 3}_2 ∨ -b^{299, 3}_1 ∨ -b^{299, 3}_0 ∨ false 
c  in DIMACS:
-23507 -23508 -23509  0

c INIT for k = 300
c    -b^{300, 1}_2
c    -b^{300, 1}_1
c    -b^{300, 1}_0
c  in DIMACS:
-23513 0
-23514 0
-23515 0

c Transitions for k = 300
c i = 1
c  -2+1 --> -1
c    ( b^{300, 1}_2 ∧  b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧  p_300) -> ( b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0)
c  in CNF:
c    -b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨  b^{300, 2}_2
c    -b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_1
c    -b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨  b^{300, 2}_0
c  in DIMACS:
-23513 -23514  23515 -300  23516 0
-23513 -23514  23515 -300 -23517 0
-23513 -23514  23515 -300  23518 0

c  -1+1 --> 0
c    ( b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧  b^{300, 1}_0 ∧  p_300) -> (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧ -b^{300, 2}_0)
c  in CNF:
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_2
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_1
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_0
c  in DIMACS:
-23513  23514 -23515 -300 -23516 0
-23513  23514 -23515 -300 -23517 0
-23513  23514 -23515 -300 -23518 0

c  0+1 --> 1
c    (-b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧  p_300) -> (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0)
c  in CNF:
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_2
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_1
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨  b^{300, 2}_0
c  in DIMACS:
 23513  23514  23515 -300 -23516 0
 23513  23514  23515 -300 -23517 0
 23513  23514  23515 -300  23518 0

c  1+1 --> 2
c    (-b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧  b^{300, 1}_0 ∧  p_300) -> (-b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0)
c  in CNF:
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_2
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨  b^{300, 2}_1
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ -p_300 ∨ -b^{300, 2}_0
c  in DIMACS:
 23513  23514 -23515 -300 -23516 0
 23513  23514 -23515 -300  23517 0
 23513  23514 -23515 -300 -23518 0

c  2+1 --> break 
c    (-b^{300, 1}_2 ∧  b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧  p_300) -> break
c  in CNF:
c     b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ -p_300 ∨ break
c  in DIMACS:
 23513 -23514  23515 -300 1162 0


c  2-1 --> 1
c    (-b^{300, 1}_2 ∧  b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧ -p_300) -> (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0)
c  in CNF:
c     b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_2
c     b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_1
c     b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨  b^{300, 2}_0
c  in DIMACS:
 23513 -23514  23515  300 -23516 0
 23513 -23514  23515  300 -23517 0
 23513 -23514  23515  300  23518 0

c  1-1 --> 0
c    (-b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧  b^{300, 1}_0 ∧ -p_300) -> (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧ -b^{300, 2}_0)
c  in CNF:
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_2
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_1
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_0
c  in DIMACS:
 23513  23514 -23515  300 -23516 0
 23513  23514 -23515  300 -23517 0
 23513  23514 -23515  300 -23518 0

c  0-1 --> -1
c    (-b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧ -p_300) -> ( b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0)
c  in CNF:
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨  b^{300, 2}_2
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_1
c     b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨  b^{300, 2}_0
c  in DIMACS:
 23513  23514  23515  300  23516 0
 23513  23514  23515  300 -23517 0
 23513  23514  23515  300  23518 0

c  -1-1 --> -2
c    ( b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧  b^{300, 1}_0 ∧ -p_300) -> ( b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0)
c  in CNF:
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨  b^{300, 2}_2
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨  b^{300, 2}_1
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨  p_300 ∨ -b^{300, 2}_0
c  in DIMACS:
-23513  23514 -23515  300  23516 0
-23513  23514 -23515  300  23517 0
-23513  23514 -23515  300 -23518 0

c  -2-1 --> break 
c    ( b^{300, 1}_2 ∧  b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧ -p_300) -> break
c  in CNF:
c    -b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨  b^{300, 1}_0 ∨  p_300 ∨ break
c  in DIMACS:
-23513 -23514  23515  300 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{300, 1}_2 ∧ -b^{300, 1}_1 ∧ -b^{300, 1}_0 ∧ true) 
c  in CNF:
c    -b^{300, 1}_2 ∨  b^{300, 1}_1 ∨  b^{300, 1}_0 ∨ false 
c  in DIMACS:
-23513  23514  23515  0

c  3 does not represent an automaton state.
c    -(-b^{300, 1}_2 ∧  b^{300, 1}_1 ∧  b^{300, 1}_0 ∧ true) 
c  in CNF:
c     b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ false 
c  in DIMACS:
 23513 -23514 -23515  0
c  -3 does not represent an automaton state.
c    -( b^{300, 1}_2 ∧  b^{300, 1}_1 ∧  b^{300, 1}_0 ∧ true) 
c  in CNF:
c    -b^{300, 1}_2 ∨ -b^{300, 1}_1 ∨ -b^{300, 1}_0 ∨ false 
c  in DIMACS:
-23513 -23514 -23515  0

c i = 2
c  -2+1 --> -1
c    ( b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧  p_600) -> ( b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0)
c  in CNF:
c    -b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨  b^{300, 3}_2
c    -b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_1
c    -b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨  b^{300, 3}_0
c  in DIMACS:
-23516 -23517  23518 -600  23519 0
-23516 -23517  23518 -600 -23520 0
-23516 -23517  23518 -600  23521 0

c  -1+1 --> 0
c    ( b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0 ∧  p_600) -> (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧ -b^{300, 3}_0)
c  in CNF:
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_2
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_1
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_0
c  in DIMACS:
-23516  23517 -23518 -600 -23519 0
-23516  23517 -23518 -600 -23520 0
-23516  23517 -23518 -600 -23521 0

c  0+1 --> 1
c    (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧  p_600) -> (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0)
c  in CNF:
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_2
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_1
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨  b^{300, 3}_0
c  in DIMACS:
 23516  23517  23518 -600 -23519 0
 23516  23517  23518 -600 -23520 0
 23516  23517  23518 -600  23521 0

c  1+1 --> 2
c    (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0 ∧  p_600) -> (-b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0)
c  in CNF:
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_2
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨  b^{300, 3}_1
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ -p_600 ∨ -b^{300, 3}_0
c  in DIMACS:
 23516  23517 -23518 -600 -23519 0
 23516  23517 -23518 -600  23520 0
 23516  23517 -23518 -600 -23521 0

c  2+1 --> break 
c    (-b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧  p_600) -> break
c  in CNF:
c     b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ -p_600 ∨ break
c  in DIMACS:
 23516 -23517  23518 -600 1162 0


c  2-1 --> 1
c    (-b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧ -p_600) -> (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0)
c  in CNF:
c     b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_2
c     b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_1
c     b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨  b^{300, 3}_0
c  in DIMACS:
 23516 -23517  23518  600 -23519 0
 23516 -23517  23518  600 -23520 0
 23516 -23517  23518  600  23521 0

c  1-1 --> 0
c    (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0 ∧ -p_600) -> (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧ -b^{300, 3}_0)
c  in CNF:
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_2
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_1
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_0
c  in DIMACS:
 23516  23517 -23518  600 -23519 0
 23516  23517 -23518  600 -23520 0
 23516  23517 -23518  600 -23521 0

c  0-1 --> -1
c    (-b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧ -p_600) -> ( b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0)
c  in CNF:
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨  b^{300, 3}_2
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_1
c     b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨  b^{300, 3}_0
c  in DIMACS:
 23516  23517  23518  600  23519 0
 23516  23517  23518  600 -23520 0
 23516  23517  23518  600  23521 0

c  -1-1 --> -2
c    ( b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧  b^{300, 2}_0 ∧ -p_600) -> ( b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0)
c  in CNF:
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨  b^{300, 3}_2
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨  b^{300, 3}_1
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨  p_600 ∨ -b^{300, 3}_0
c  in DIMACS:
-23516  23517 -23518  600  23519 0
-23516  23517 -23518  600  23520 0
-23516  23517 -23518  600 -23521 0

c  -2-1 --> break 
c    ( b^{300, 2}_2 ∧  b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧ -p_600) -> break
c  in CNF:
c    -b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨  b^{300, 2}_0 ∨  p_600 ∨ break
c  in DIMACS:
-23516 -23517  23518  600 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{300, 2}_2 ∧ -b^{300, 2}_1 ∧ -b^{300, 2}_0 ∧ true) 
c  in CNF:
c    -b^{300, 2}_2 ∨  b^{300, 2}_1 ∨  b^{300, 2}_0 ∨ false 
c  in DIMACS:
-23516  23517  23518  0

c  3 does not represent an automaton state.
c    -(-b^{300, 2}_2 ∧  b^{300, 2}_1 ∧  b^{300, 2}_0 ∧ true) 
c  in CNF:
c     b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ false 
c  in DIMACS:
 23516 -23517 -23518  0
c  -3 does not represent an automaton state.
c    -( b^{300, 2}_2 ∧  b^{300, 2}_1 ∧  b^{300, 2}_0 ∧ true) 
c  in CNF:
c    -b^{300, 2}_2 ∨ -b^{300, 2}_1 ∨ -b^{300, 2}_0 ∨ false 
c  in DIMACS:
-23516 -23517 -23518  0

c i = 3
c  -2+1 --> -1
c    ( b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧  p_900) -> ( b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧  b^{300, 4}_0)
c  in CNF:
c    -b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨  b^{300, 4}_2
c    -b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_1
c    -b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨  b^{300, 4}_0
c  in DIMACS:
-23519 -23520  23521 -900  23522 0
-23519 -23520  23521 -900 -23523 0
-23519 -23520  23521 -900  23524 0

c  -1+1 --> 0
c    ( b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0 ∧  p_900) -> (-b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧ -b^{300, 4}_0)
c  in CNF:
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_2
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_1
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_0
c  in DIMACS:
-23519  23520 -23521 -900 -23522 0
-23519  23520 -23521 -900 -23523 0
-23519  23520 -23521 -900 -23524 0

c  0+1 --> 1
c    (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧  p_900) -> (-b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧  b^{300, 4}_0)
c  in CNF:
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_2
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_1
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨  b^{300, 4}_0
c  in DIMACS:
 23519  23520  23521 -900 -23522 0
 23519  23520  23521 -900 -23523 0
 23519  23520  23521 -900  23524 0

c  1+1 --> 2
c    (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0 ∧  p_900) -> (-b^{300, 4}_2 ∧  b^{300, 4}_1 ∧ -b^{300, 4}_0)
c  in CNF:
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_2
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨  b^{300, 4}_1
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ -p_900 ∨ -b^{300, 4}_0
c  in DIMACS:
 23519  23520 -23521 -900 -23522 0
 23519  23520 -23521 -900  23523 0
 23519  23520 -23521 -900 -23524 0

c  2+1 --> break 
c    (-b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧  p_900) -> break
c  in CNF:
c     b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ -p_900 ∨ break
c  in DIMACS:
 23519 -23520  23521 -900 1162 0


c  2-1 --> 1
c    (-b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧ -p_900) -> (-b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧  b^{300, 4}_0)
c  in CNF:
c     b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_2
c     b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_1
c     b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨  b^{300, 4}_0
c  in DIMACS:
 23519 -23520  23521  900 -23522 0
 23519 -23520  23521  900 -23523 0
 23519 -23520  23521  900  23524 0

c  1-1 --> 0
c    (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0 ∧ -p_900) -> (-b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧ -b^{300, 4}_0)
c  in CNF:
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_2
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_1
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_0
c  in DIMACS:
 23519  23520 -23521  900 -23522 0
 23519  23520 -23521  900 -23523 0
 23519  23520 -23521  900 -23524 0

c  0-1 --> -1
c    (-b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧ -p_900) -> ( b^{300, 4}_2 ∧ -b^{300, 4}_1 ∧  b^{300, 4}_0)
c  in CNF:
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨  b^{300, 4}_2
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_1
c     b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨  b^{300, 4}_0
c  in DIMACS:
 23519  23520  23521  900  23522 0
 23519  23520  23521  900 -23523 0
 23519  23520  23521  900  23524 0

c  -1-1 --> -2
c    ( b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧  b^{300, 3}_0 ∧ -p_900) -> ( b^{300, 4}_2 ∧  b^{300, 4}_1 ∧ -b^{300, 4}_0)
c  in CNF:
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨  b^{300, 4}_2
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨  b^{300, 4}_1
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨  p_900 ∨ -b^{300, 4}_0
c  in DIMACS:
-23519  23520 -23521  900  23522 0
-23519  23520 -23521  900  23523 0
-23519  23520 -23521  900 -23524 0

c  -2-1 --> break 
c    ( b^{300, 3}_2 ∧  b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧ -p_900) -> break
c  in CNF:
c    -b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨  b^{300, 3}_0 ∨  p_900 ∨ break
c  in DIMACS:
-23519 -23520  23521  900 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{300, 3}_2 ∧ -b^{300, 3}_1 ∧ -b^{300, 3}_0 ∧ true) 
c  in CNF:
c    -b^{300, 3}_2 ∨  b^{300, 3}_1 ∨  b^{300, 3}_0 ∨ false 
c  in DIMACS:
-23519  23520  23521  0

c  3 does not represent an automaton state.
c    -(-b^{300, 3}_2 ∧  b^{300, 3}_1 ∧  b^{300, 3}_0 ∧ true) 
c  in CNF:
c     b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ false 
c  in DIMACS:
 23519 -23520 -23521  0
c  -3 does not represent an automaton state.
c    -( b^{300, 3}_2 ∧  b^{300, 3}_1 ∧  b^{300, 3}_0 ∧ true) 
c  in CNF:
c    -b^{300, 3}_2 ∨ -b^{300, 3}_1 ∨ -b^{300, 3}_0 ∨ false 
c  in DIMACS:
-23519 -23520 -23521  0

c INIT for k = 301
c    -b^{301, 1}_2
c    -b^{301, 1}_1
c    -b^{301, 1}_0
c  in DIMACS:
-23525 0
-23526 0
-23527 0

c Transitions for k = 301
c i = 1
c  -2+1 --> -1
c    ( b^{301, 1}_2 ∧  b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧  p_301) -> ( b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0)
c  in CNF:
c    -b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨  b^{301, 2}_2
c    -b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_1
c    -b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨  b^{301, 2}_0
c  in DIMACS:
-23525 -23526  23527 -301  23528 0
-23525 -23526  23527 -301 -23529 0
-23525 -23526  23527 -301  23530 0

c  -1+1 --> 0
c    ( b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧  b^{301, 1}_0 ∧  p_301) -> (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧ -b^{301, 2}_0)
c  in CNF:
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_2
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_1
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_0
c  in DIMACS:
-23525  23526 -23527 -301 -23528 0
-23525  23526 -23527 -301 -23529 0
-23525  23526 -23527 -301 -23530 0

c  0+1 --> 1
c    (-b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧  p_301) -> (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0)
c  in CNF:
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_2
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_1
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨  b^{301, 2}_0
c  in DIMACS:
 23525  23526  23527 -301 -23528 0
 23525  23526  23527 -301 -23529 0
 23525  23526  23527 -301  23530 0

c  1+1 --> 2
c    (-b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧  b^{301, 1}_0 ∧  p_301) -> (-b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0)
c  in CNF:
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_2
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨  b^{301, 2}_1
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ -p_301 ∨ -b^{301, 2}_0
c  in DIMACS:
 23525  23526 -23527 -301 -23528 0
 23525  23526 -23527 -301  23529 0
 23525  23526 -23527 -301 -23530 0

c  2+1 --> break 
c    (-b^{301, 1}_2 ∧  b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧  p_301) -> break
c  in CNF:
c     b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ -p_301 ∨ break
c  in DIMACS:
 23525 -23526  23527 -301 1162 0


c  2-1 --> 1
c    (-b^{301, 1}_2 ∧  b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧ -p_301) -> (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0)
c  in CNF:
c     b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_2
c     b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_1
c     b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨  b^{301, 2}_0
c  in DIMACS:
 23525 -23526  23527  301 -23528 0
 23525 -23526  23527  301 -23529 0
 23525 -23526  23527  301  23530 0

c  1-1 --> 0
c    (-b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧  b^{301, 1}_0 ∧ -p_301) -> (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧ -b^{301, 2}_0)
c  in CNF:
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_2
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_1
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_0
c  in DIMACS:
 23525  23526 -23527  301 -23528 0
 23525  23526 -23527  301 -23529 0
 23525  23526 -23527  301 -23530 0

c  0-1 --> -1
c    (-b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧ -p_301) -> ( b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0)
c  in CNF:
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨  b^{301, 2}_2
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_1
c     b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨  b^{301, 2}_0
c  in DIMACS:
 23525  23526  23527  301  23528 0
 23525  23526  23527  301 -23529 0
 23525  23526  23527  301  23530 0

c  -1-1 --> -2
c    ( b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧  b^{301, 1}_0 ∧ -p_301) -> ( b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0)
c  in CNF:
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨  b^{301, 2}_2
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨  b^{301, 2}_1
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨  p_301 ∨ -b^{301, 2}_0
c  in DIMACS:
-23525  23526 -23527  301  23528 0
-23525  23526 -23527  301  23529 0
-23525  23526 -23527  301 -23530 0

c  -2-1 --> break 
c    ( b^{301, 1}_2 ∧  b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧ -p_301) -> break
c  in CNF:
c    -b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨  b^{301, 1}_0 ∨  p_301 ∨ break
c  in DIMACS:
-23525 -23526  23527  301 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{301, 1}_2 ∧ -b^{301, 1}_1 ∧ -b^{301, 1}_0 ∧ true) 
c  in CNF:
c    -b^{301, 1}_2 ∨  b^{301, 1}_1 ∨  b^{301, 1}_0 ∨ false 
c  in DIMACS:
-23525  23526  23527  0

c  3 does not represent an automaton state.
c    -(-b^{301, 1}_2 ∧  b^{301, 1}_1 ∧  b^{301, 1}_0 ∧ true) 
c  in CNF:
c     b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ false 
c  in DIMACS:
 23525 -23526 -23527  0
c  -3 does not represent an automaton state.
c    -( b^{301, 1}_2 ∧  b^{301, 1}_1 ∧  b^{301, 1}_0 ∧ true) 
c  in CNF:
c    -b^{301, 1}_2 ∨ -b^{301, 1}_1 ∨ -b^{301, 1}_0 ∨ false 
c  in DIMACS:
-23525 -23526 -23527  0

c i = 2
c  -2+1 --> -1
c    ( b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧  p_602) -> ( b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0)
c  in CNF:
c    -b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨  b^{301, 3}_2
c    -b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_1
c    -b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨  b^{301, 3}_0
c  in DIMACS:
-23528 -23529  23530 -602  23531 0
-23528 -23529  23530 -602 -23532 0
-23528 -23529  23530 -602  23533 0

c  -1+1 --> 0
c    ( b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0 ∧  p_602) -> (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧ -b^{301, 3}_0)
c  in CNF:
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_2
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_1
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_0
c  in DIMACS:
-23528  23529 -23530 -602 -23531 0
-23528  23529 -23530 -602 -23532 0
-23528  23529 -23530 -602 -23533 0

c  0+1 --> 1
c    (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧  p_602) -> (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0)
c  in CNF:
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_2
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_1
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨  b^{301, 3}_0
c  in DIMACS:
 23528  23529  23530 -602 -23531 0
 23528  23529  23530 -602 -23532 0
 23528  23529  23530 -602  23533 0

c  1+1 --> 2
c    (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0 ∧  p_602) -> (-b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0)
c  in CNF:
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_2
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨  b^{301, 3}_1
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ -p_602 ∨ -b^{301, 3}_0
c  in DIMACS:
 23528  23529 -23530 -602 -23531 0
 23528  23529 -23530 -602  23532 0
 23528  23529 -23530 -602 -23533 0

c  2+1 --> break 
c    (-b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧  p_602) -> break
c  in CNF:
c     b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ -p_602 ∨ break
c  in DIMACS:
 23528 -23529  23530 -602 1162 0


c  2-1 --> 1
c    (-b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧ -p_602) -> (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0)
c  in CNF:
c     b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_2
c     b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_1
c     b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨  b^{301, 3}_0
c  in DIMACS:
 23528 -23529  23530  602 -23531 0
 23528 -23529  23530  602 -23532 0
 23528 -23529  23530  602  23533 0

c  1-1 --> 0
c    (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0 ∧ -p_602) -> (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧ -b^{301, 3}_0)
c  in CNF:
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_2
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_1
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_0
c  in DIMACS:
 23528  23529 -23530  602 -23531 0
 23528  23529 -23530  602 -23532 0
 23528  23529 -23530  602 -23533 0

c  0-1 --> -1
c    (-b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧ -p_602) -> ( b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0)
c  in CNF:
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨  b^{301, 3}_2
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_1
c     b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨  b^{301, 3}_0
c  in DIMACS:
 23528  23529  23530  602  23531 0
 23528  23529  23530  602 -23532 0
 23528  23529  23530  602  23533 0

c  -1-1 --> -2
c    ( b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧  b^{301, 2}_0 ∧ -p_602) -> ( b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0)
c  in CNF:
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨  b^{301, 3}_2
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨  b^{301, 3}_1
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨  p_602 ∨ -b^{301, 3}_0
c  in DIMACS:
-23528  23529 -23530  602  23531 0
-23528  23529 -23530  602  23532 0
-23528  23529 -23530  602 -23533 0

c  -2-1 --> break 
c    ( b^{301, 2}_2 ∧  b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧ -p_602) -> break
c  in CNF:
c    -b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨  b^{301, 2}_0 ∨  p_602 ∨ break
c  in DIMACS:
-23528 -23529  23530  602 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{301, 2}_2 ∧ -b^{301, 2}_1 ∧ -b^{301, 2}_0 ∧ true) 
c  in CNF:
c    -b^{301, 2}_2 ∨  b^{301, 2}_1 ∨  b^{301, 2}_0 ∨ false 
c  in DIMACS:
-23528  23529  23530  0

c  3 does not represent an automaton state.
c    -(-b^{301, 2}_2 ∧  b^{301, 2}_1 ∧  b^{301, 2}_0 ∧ true) 
c  in CNF:
c     b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ false 
c  in DIMACS:
 23528 -23529 -23530  0
c  -3 does not represent an automaton state.
c    -( b^{301, 2}_2 ∧  b^{301, 2}_1 ∧  b^{301, 2}_0 ∧ true) 
c  in CNF:
c    -b^{301, 2}_2 ∨ -b^{301, 2}_1 ∨ -b^{301, 2}_0 ∨ false 
c  in DIMACS:
-23528 -23529 -23530  0

c i = 3
c  -2+1 --> -1
c    ( b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧  p_903) -> ( b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧  b^{301, 4}_0)
c  in CNF:
c    -b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨  b^{301, 4}_2
c    -b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_1
c    -b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨  b^{301, 4}_0
c  in DIMACS:
-23531 -23532  23533 -903  23534 0
-23531 -23532  23533 -903 -23535 0
-23531 -23532  23533 -903  23536 0

c  -1+1 --> 0
c    ( b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0 ∧  p_903) -> (-b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧ -b^{301, 4}_0)
c  in CNF:
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_2
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_1
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_0
c  in DIMACS:
-23531  23532 -23533 -903 -23534 0
-23531  23532 -23533 -903 -23535 0
-23531  23532 -23533 -903 -23536 0

c  0+1 --> 1
c    (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧  p_903) -> (-b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧  b^{301, 4}_0)
c  in CNF:
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_2
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_1
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨  b^{301, 4}_0
c  in DIMACS:
 23531  23532  23533 -903 -23534 0
 23531  23532  23533 -903 -23535 0
 23531  23532  23533 -903  23536 0

c  1+1 --> 2
c    (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0 ∧  p_903) -> (-b^{301, 4}_2 ∧  b^{301, 4}_1 ∧ -b^{301, 4}_0)
c  in CNF:
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_2
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨  b^{301, 4}_1
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ -p_903 ∨ -b^{301, 4}_0
c  in DIMACS:
 23531  23532 -23533 -903 -23534 0
 23531  23532 -23533 -903  23535 0
 23531  23532 -23533 -903 -23536 0

c  2+1 --> break 
c    (-b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧  p_903) -> break
c  in CNF:
c     b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ -p_903 ∨ break
c  in DIMACS:
 23531 -23532  23533 -903 1162 0


c  2-1 --> 1
c    (-b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧ -p_903) -> (-b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧  b^{301, 4}_0)
c  in CNF:
c     b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_2
c     b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_1
c     b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨  b^{301, 4}_0
c  in DIMACS:
 23531 -23532  23533  903 -23534 0
 23531 -23532  23533  903 -23535 0
 23531 -23532  23533  903  23536 0

c  1-1 --> 0
c    (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0 ∧ -p_903) -> (-b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧ -b^{301, 4}_0)
c  in CNF:
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_2
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_1
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_0
c  in DIMACS:
 23531  23532 -23533  903 -23534 0
 23531  23532 -23533  903 -23535 0
 23531  23532 -23533  903 -23536 0

c  0-1 --> -1
c    (-b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧ -p_903) -> ( b^{301, 4}_2 ∧ -b^{301, 4}_1 ∧  b^{301, 4}_0)
c  in CNF:
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨  b^{301, 4}_2
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_1
c     b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨  b^{301, 4}_0
c  in DIMACS:
 23531  23532  23533  903  23534 0
 23531  23532  23533  903 -23535 0
 23531  23532  23533  903  23536 0

c  -1-1 --> -2
c    ( b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧  b^{301, 3}_0 ∧ -p_903) -> ( b^{301, 4}_2 ∧  b^{301, 4}_1 ∧ -b^{301, 4}_0)
c  in CNF:
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨  b^{301, 4}_2
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨  b^{301, 4}_1
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨  p_903 ∨ -b^{301, 4}_0
c  in DIMACS:
-23531  23532 -23533  903  23534 0
-23531  23532 -23533  903  23535 0
-23531  23532 -23533  903 -23536 0

c  -2-1 --> break 
c    ( b^{301, 3}_2 ∧  b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧ -p_903) -> break
c  in CNF:
c    -b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨  b^{301, 3}_0 ∨  p_903 ∨ break
c  in DIMACS:
-23531 -23532  23533  903 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{301, 3}_2 ∧ -b^{301, 3}_1 ∧ -b^{301, 3}_0 ∧ true) 
c  in CNF:
c    -b^{301, 3}_2 ∨  b^{301, 3}_1 ∨  b^{301, 3}_0 ∨ false 
c  in DIMACS:
-23531  23532  23533  0

c  3 does not represent an automaton state.
c    -(-b^{301, 3}_2 ∧  b^{301, 3}_1 ∧  b^{301, 3}_0 ∧ true) 
c  in CNF:
c     b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ false 
c  in DIMACS:
 23531 -23532 -23533  0
c  -3 does not represent an automaton state.
c    -( b^{301, 3}_2 ∧  b^{301, 3}_1 ∧  b^{301, 3}_0 ∧ true) 
c  in CNF:
c    -b^{301, 3}_2 ∨ -b^{301, 3}_1 ∨ -b^{301, 3}_0 ∨ false 
c  in DIMACS:
-23531 -23532 -23533  0

c INIT for k = 302
c    -b^{302, 1}_2
c    -b^{302, 1}_1
c    -b^{302, 1}_0
c  in DIMACS:
-23537 0
-23538 0
-23539 0

c Transitions for k = 302
c i = 1
c  -2+1 --> -1
c    ( b^{302, 1}_2 ∧  b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧  p_302) -> ( b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0)
c  in CNF:
c    -b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨  b^{302, 2}_2
c    -b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_1
c    -b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨  b^{302, 2}_0
c  in DIMACS:
-23537 -23538  23539 -302  23540 0
-23537 -23538  23539 -302 -23541 0
-23537 -23538  23539 -302  23542 0

c  -1+1 --> 0
c    ( b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧  b^{302, 1}_0 ∧  p_302) -> (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧ -b^{302, 2}_0)
c  in CNF:
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_2
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_1
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_0
c  in DIMACS:
-23537  23538 -23539 -302 -23540 0
-23537  23538 -23539 -302 -23541 0
-23537  23538 -23539 -302 -23542 0

c  0+1 --> 1
c    (-b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧  p_302) -> (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0)
c  in CNF:
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_2
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_1
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨  b^{302, 2}_0
c  in DIMACS:
 23537  23538  23539 -302 -23540 0
 23537  23538  23539 -302 -23541 0
 23537  23538  23539 -302  23542 0

c  1+1 --> 2
c    (-b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧  b^{302, 1}_0 ∧  p_302) -> (-b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0)
c  in CNF:
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_2
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨  b^{302, 2}_1
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ -p_302 ∨ -b^{302, 2}_0
c  in DIMACS:
 23537  23538 -23539 -302 -23540 0
 23537  23538 -23539 -302  23541 0
 23537  23538 -23539 -302 -23542 0

c  2+1 --> break 
c    (-b^{302, 1}_2 ∧  b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧  p_302) -> break
c  in CNF:
c     b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ -p_302 ∨ break
c  in DIMACS:
 23537 -23538  23539 -302 1162 0


c  2-1 --> 1
c    (-b^{302, 1}_2 ∧  b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧ -p_302) -> (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0)
c  in CNF:
c     b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_2
c     b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_1
c     b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨  b^{302, 2}_0
c  in DIMACS:
 23537 -23538  23539  302 -23540 0
 23537 -23538  23539  302 -23541 0
 23537 -23538  23539  302  23542 0

c  1-1 --> 0
c    (-b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧  b^{302, 1}_0 ∧ -p_302) -> (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧ -b^{302, 2}_0)
c  in CNF:
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_2
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_1
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_0
c  in DIMACS:
 23537  23538 -23539  302 -23540 0
 23537  23538 -23539  302 -23541 0
 23537  23538 -23539  302 -23542 0

c  0-1 --> -1
c    (-b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧ -p_302) -> ( b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0)
c  in CNF:
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨  b^{302, 2}_2
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_1
c     b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨  b^{302, 2}_0
c  in DIMACS:
 23537  23538  23539  302  23540 0
 23537  23538  23539  302 -23541 0
 23537  23538  23539  302  23542 0

c  -1-1 --> -2
c    ( b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧  b^{302, 1}_0 ∧ -p_302) -> ( b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0)
c  in CNF:
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨  b^{302, 2}_2
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨  b^{302, 2}_1
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨  p_302 ∨ -b^{302, 2}_0
c  in DIMACS:
-23537  23538 -23539  302  23540 0
-23537  23538 -23539  302  23541 0
-23537  23538 -23539  302 -23542 0

c  -2-1 --> break 
c    ( b^{302, 1}_2 ∧  b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧ -p_302) -> break
c  in CNF:
c    -b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨  b^{302, 1}_0 ∨  p_302 ∨ break
c  in DIMACS:
-23537 -23538  23539  302 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{302, 1}_2 ∧ -b^{302, 1}_1 ∧ -b^{302, 1}_0 ∧ true) 
c  in CNF:
c    -b^{302, 1}_2 ∨  b^{302, 1}_1 ∨  b^{302, 1}_0 ∨ false 
c  in DIMACS:
-23537  23538  23539  0

c  3 does not represent an automaton state.
c    -(-b^{302, 1}_2 ∧  b^{302, 1}_1 ∧  b^{302, 1}_0 ∧ true) 
c  in CNF:
c     b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ false 
c  in DIMACS:
 23537 -23538 -23539  0
c  -3 does not represent an automaton state.
c    -( b^{302, 1}_2 ∧  b^{302, 1}_1 ∧  b^{302, 1}_0 ∧ true) 
c  in CNF:
c    -b^{302, 1}_2 ∨ -b^{302, 1}_1 ∨ -b^{302, 1}_0 ∨ false 
c  in DIMACS:
-23537 -23538 -23539  0

c i = 2
c  -2+1 --> -1
c    ( b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧  p_604) -> ( b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0)
c  in CNF:
c    -b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨  b^{302, 3}_2
c    -b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_1
c    -b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨  b^{302, 3}_0
c  in DIMACS:
-23540 -23541  23542 -604  23543 0
-23540 -23541  23542 -604 -23544 0
-23540 -23541  23542 -604  23545 0

c  -1+1 --> 0
c    ( b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0 ∧  p_604) -> (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧ -b^{302, 3}_0)
c  in CNF:
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_2
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_1
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_0
c  in DIMACS:
-23540  23541 -23542 -604 -23543 0
-23540  23541 -23542 -604 -23544 0
-23540  23541 -23542 -604 -23545 0

c  0+1 --> 1
c    (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧  p_604) -> (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0)
c  in CNF:
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_2
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_1
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨  b^{302, 3}_0
c  in DIMACS:
 23540  23541  23542 -604 -23543 0
 23540  23541  23542 -604 -23544 0
 23540  23541  23542 -604  23545 0

c  1+1 --> 2
c    (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0 ∧  p_604) -> (-b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0)
c  in CNF:
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_2
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨  b^{302, 3}_1
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ -p_604 ∨ -b^{302, 3}_0
c  in DIMACS:
 23540  23541 -23542 -604 -23543 0
 23540  23541 -23542 -604  23544 0
 23540  23541 -23542 -604 -23545 0

c  2+1 --> break 
c    (-b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧  p_604) -> break
c  in CNF:
c     b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ -p_604 ∨ break
c  in DIMACS:
 23540 -23541  23542 -604 1162 0


c  2-1 --> 1
c    (-b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧ -p_604) -> (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0)
c  in CNF:
c     b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_2
c     b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_1
c     b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨  b^{302, 3}_0
c  in DIMACS:
 23540 -23541  23542  604 -23543 0
 23540 -23541  23542  604 -23544 0
 23540 -23541  23542  604  23545 0

c  1-1 --> 0
c    (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0 ∧ -p_604) -> (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧ -b^{302, 3}_0)
c  in CNF:
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_2
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_1
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_0
c  in DIMACS:
 23540  23541 -23542  604 -23543 0
 23540  23541 -23542  604 -23544 0
 23540  23541 -23542  604 -23545 0

c  0-1 --> -1
c    (-b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧ -p_604) -> ( b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0)
c  in CNF:
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨  b^{302, 3}_2
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_1
c     b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨  b^{302, 3}_0
c  in DIMACS:
 23540  23541  23542  604  23543 0
 23540  23541  23542  604 -23544 0
 23540  23541  23542  604  23545 0

c  -1-1 --> -2
c    ( b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧  b^{302, 2}_0 ∧ -p_604) -> ( b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0)
c  in CNF:
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨  b^{302, 3}_2
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨  b^{302, 3}_1
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨  p_604 ∨ -b^{302, 3}_0
c  in DIMACS:
-23540  23541 -23542  604  23543 0
-23540  23541 -23542  604  23544 0
-23540  23541 -23542  604 -23545 0

c  -2-1 --> break 
c    ( b^{302, 2}_2 ∧  b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧ -p_604) -> break
c  in CNF:
c    -b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨  b^{302, 2}_0 ∨  p_604 ∨ break
c  in DIMACS:
-23540 -23541  23542  604 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{302, 2}_2 ∧ -b^{302, 2}_1 ∧ -b^{302, 2}_0 ∧ true) 
c  in CNF:
c    -b^{302, 2}_2 ∨  b^{302, 2}_1 ∨  b^{302, 2}_0 ∨ false 
c  in DIMACS:
-23540  23541  23542  0

c  3 does not represent an automaton state.
c    -(-b^{302, 2}_2 ∧  b^{302, 2}_1 ∧  b^{302, 2}_0 ∧ true) 
c  in CNF:
c     b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ false 
c  in DIMACS:
 23540 -23541 -23542  0
c  -3 does not represent an automaton state.
c    -( b^{302, 2}_2 ∧  b^{302, 2}_1 ∧  b^{302, 2}_0 ∧ true) 
c  in CNF:
c    -b^{302, 2}_2 ∨ -b^{302, 2}_1 ∨ -b^{302, 2}_0 ∨ false 
c  in DIMACS:
-23540 -23541 -23542  0

c i = 3
c  -2+1 --> -1
c    ( b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧  p_906) -> ( b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧  b^{302, 4}_0)
c  in CNF:
c    -b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨  b^{302, 4}_2
c    -b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_1
c    -b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨  b^{302, 4}_0
c  in DIMACS:
-23543 -23544  23545 -906  23546 0
-23543 -23544  23545 -906 -23547 0
-23543 -23544  23545 -906  23548 0

c  -1+1 --> 0
c    ( b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0 ∧  p_906) -> (-b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧ -b^{302, 4}_0)
c  in CNF:
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_2
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_1
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_0
c  in DIMACS:
-23543  23544 -23545 -906 -23546 0
-23543  23544 -23545 -906 -23547 0
-23543  23544 -23545 -906 -23548 0

c  0+1 --> 1
c    (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧  p_906) -> (-b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧  b^{302, 4}_0)
c  in CNF:
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_2
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_1
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨  b^{302, 4}_0
c  in DIMACS:
 23543  23544  23545 -906 -23546 0
 23543  23544  23545 -906 -23547 0
 23543  23544  23545 -906  23548 0

c  1+1 --> 2
c    (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0 ∧  p_906) -> (-b^{302, 4}_2 ∧  b^{302, 4}_1 ∧ -b^{302, 4}_0)
c  in CNF:
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_2
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨  b^{302, 4}_1
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ -p_906 ∨ -b^{302, 4}_0
c  in DIMACS:
 23543  23544 -23545 -906 -23546 0
 23543  23544 -23545 -906  23547 0
 23543  23544 -23545 -906 -23548 0

c  2+1 --> break 
c    (-b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧  p_906) -> break
c  in CNF:
c     b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ -p_906 ∨ break
c  in DIMACS:
 23543 -23544  23545 -906 1162 0


c  2-1 --> 1
c    (-b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧ -p_906) -> (-b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧  b^{302, 4}_0)
c  in CNF:
c     b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_2
c     b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_1
c     b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨  b^{302, 4}_0
c  in DIMACS:
 23543 -23544  23545  906 -23546 0
 23543 -23544  23545  906 -23547 0
 23543 -23544  23545  906  23548 0

c  1-1 --> 0
c    (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0 ∧ -p_906) -> (-b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧ -b^{302, 4}_0)
c  in CNF:
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_2
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_1
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_0
c  in DIMACS:
 23543  23544 -23545  906 -23546 0
 23543  23544 -23545  906 -23547 0
 23543  23544 -23545  906 -23548 0

c  0-1 --> -1
c    (-b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧ -p_906) -> ( b^{302, 4}_2 ∧ -b^{302, 4}_1 ∧  b^{302, 4}_0)
c  in CNF:
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨  b^{302, 4}_2
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_1
c     b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨  b^{302, 4}_0
c  in DIMACS:
 23543  23544  23545  906  23546 0
 23543  23544  23545  906 -23547 0
 23543  23544  23545  906  23548 0

c  -1-1 --> -2
c    ( b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧  b^{302, 3}_0 ∧ -p_906) -> ( b^{302, 4}_2 ∧  b^{302, 4}_1 ∧ -b^{302, 4}_0)
c  in CNF:
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨  b^{302, 4}_2
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨  b^{302, 4}_1
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨  p_906 ∨ -b^{302, 4}_0
c  in DIMACS:
-23543  23544 -23545  906  23546 0
-23543  23544 -23545  906  23547 0
-23543  23544 -23545  906 -23548 0

c  -2-1 --> break 
c    ( b^{302, 3}_2 ∧  b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧ -p_906) -> break
c  in CNF:
c    -b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨  b^{302, 3}_0 ∨  p_906 ∨ break
c  in DIMACS:
-23543 -23544  23545  906 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{302, 3}_2 ∧ -b^{302, 3}_1 ∧ -b^{302, 3}_0 ∧ true) 
c  in CNF:
c    -b^{302, 3}_2 ∨  b^{302, 3}_1 ∨  b^{302, 3}_0 ∨ false 
c  in DIMACS:
-23543  23544  23545  0

c  3 does not represent an automaton state.
c    -(-b^{302, 3}_2 ∧  b^{302, 3}_1 ∧  b^{302, 3}_0 ∧ true) 
c  in CNF:
c     b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ false 
c  in DIMACS:
 23543 -23544 -23545  0
c  -3 does not represent an automaton state.
c    -( b^{302, 3}_2 ∧  b^{302, 3}_1 ∧  b^{302, 3}_0 ∧ true) 
c  in CNF:
c    -b^{302, 3}_2 ∨ -b^{302, 3}_1 ∨ -b^{302, 3}_0 ∨ false 
c  in DIMACS:
-23543 -23544 -23545  0

c INIT for k = 303
c    -b^{303, 1}_2
c    -b^{303, 1}_1
c    -b^{303, 1}_0
c  in DIMACS:
-23549 0
-23550 0
-23551 0

c Transitions for k = 303
c i = 1
c  -2+1 --> -1
c    ( b^{303, 1}_2 ∧  b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧  p_303) -> ( b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0)
c  in CNF:
c    -b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨  b^{303, 2}_2
c    -b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_1
c    -b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨  b^{303, 2}_0
c  in DIMACS:
-23549 -23550  23551 -303  23552 0
-23549 -23550  23551 -303 -23553 0
-23549 -23550  23551 -303  23554 0

c  -1+1 --> 0
c    ( b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧  b^{303, 1}_0 ∧  p_303) -> (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧ -b^{303, 2}_0)
c  in CNF:
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_2
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_1
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_0
c  in DIMACS:
-23549  23550 -23551 -303 -23552 0
-23549  23550 -23551 -303 -23553 0
-23549  23550 -23551 -303 -23554 0

c  0+1 --> 1
c    (-b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧  p_303) -> (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0)
c  in CNF:
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_2
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_1
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨  b^{303, 2}_0
c  in DIMACS:
 23549  23550  23551 -303 -23552 0
 23549  23550  23551 -303 -23553 0
 23549  23550  23551 -303  23554 0

c  1+1 --> 2
c    (-b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧  b^{303, 1}_0 ∧  p_303) -> (-b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0)
c  in CNF:
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_2
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨  b^{303, 2}_1
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ -p_303 ∨ -b^{303, 2}_0
c  in DIMACS:
 23549  23550 -23551 -303 -23552 0
 23549  23550 -23551 -303  23553 0
 23549  23550 -23551 -303 -23554 0

c  2+1 --> break 
c    (-b^{303, 1}_2 ∧  b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧  p_303) -> break
c  in CNF:
c     b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ -p_303 ∨ break
c  in DIMACS:
 23549 -23550  23551 -303 1162 0


c  2-1 --> 1
c    (-b^{303, 1}_2 ∧  b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧ -p_303) -> (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0)
c  in CNF:
c     b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_2
c     b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_1
c     b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨  b^{303, 2}_0
c  in DIMACS:
 23549 -23550  23551  303 -23552 0
 23549 -23550  23551  303 -23553 0
 23549 -23550  23551  303  23554 0

c  1-1 --> 0
c    (-b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧  b^{303, 1}_0 ∧ -p_303) -> (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧ -b^{303, 2}_0)
c  in CNF:
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_2
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_1
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_0
c  in DIMACS:
 23549  23550 -23551  303 -23552 0
 23549  23550 -23551  303 -23553 0
 23549  23550 -23551  303 -23554 0

c  0-1 --> -1
c    (-b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧ -p_303) -> ( b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0)
c  in CNF:
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨  b^{303, 2}_2
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_1
c     b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨  b^{303, 2}_0
c  in DIMACS:
 23549  23550  23551  303  23552 0
 23549  23550  23551  303 -23553 0
 23549  23550  23551  303  23554 0

c  -1-1 --> -2
c    ( b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧  b^{303, 1}_0 ∧ -p_303) -> ( b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0)
c  in CNF:
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨  b^{303, 2}_2
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨  b^{303, 2}_1
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨  p_303 ∨ -b^{303, 2}_0
c  in DIMACS:
-23549  23550 -23551  303  23552 0
-23549  23550 -23551  303  23553 0
-23549  23550 -23551  303 -23554 0

c  -2-1 --> break 
c    ( b^{303, 1}_2 ∧  b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧ -p_303) -> break
c  in CNF:
c    -b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨  b^{303, 1}_0 ∨  p_303 ∨ break
c  in DIMACS:
-23549 -23550  23551  303 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{303, 1}_2 ∧ -b^{303, 1}_1 ∧ -b^{303, 1}_0 ∧ true) 
c  in CNF:
c    -b^{303, 1}_2 ∨  b^{303, 1}_1 ∨  b^{303, 1}_0 ∨ false 
c  in DIMACS:
-23549  23550  23551  0

c  3 does not represent an automaton state.
c    -(-b^{303, 1}_2 ∧  b^{303, 1}_1 ∧  b^{303, 1}_0 ∧ true) 
c  in CNF:
c     b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ false 
c  in DIMACS:
 23549 -23550 -23551  0
c  -3 does not represent an automaton state.
c    -( b^{303, 1}_2 ∧  b^{303, 1}_1 ∧  b^{303, 1}_0 ∧ true) 
c  in CNF:
c    -b^{303, 1}_2 ∨ -b^{303, 1}_1 ∨ -b^{303, 1}_0 ∨ false 
c  in DIMACS:
-23549 -23550 -23551  0

c i = 2
c  -2+1 --> -1
c    ( b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧  p_606) -> ( b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0)
c  in CNF:
c    -b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨  b^{303, 3}_2
c    -b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_1
c    -b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨  b^{303, 3}_0
c  in DIMACS:
-23552 -23553  23554 -606  23555 0
-23552 -23553  23554 -606 -23556 0
-23552 -23553  23554 -606  23557 0

c  -1+1 --> 0
c    ( b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0 ∧  p_606) -> (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧ -b^{303, 3}_0)
c  in CNF:
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_2
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_1
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_0
c  in DIMACS:
-23552  23553 -23554 -606 -23555 0
-23552  23553 -23554 -606 -23556 0
-23552  23553 -23554 -606 -23557 0

c  0+1 --> 1
c    (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧  p_606) -> (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0)
c  in CNF:
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_2
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_1
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨  b^{303, 3}_0
c  in DIMACS:
 23552  23553  23554 -606 -23555 0
 23552  23553  23554 -606 -23556 0
 23552  23553  23554 -606  23557 0

c  1+1 --> 2
c    (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0 ∧  p_606) -> (-b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0)
c  in CNF:
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_2
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨  b^{303, 3}_1
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ -p_606 ∨ -b^{303, 3}_0
c  in DIMACS:
 23552  23553 -23554 -606 -23555 0
 23552  23553 -23554 -606  23556 0
 23552  23553 -23554 -606 -23557 0

c  2+1 --> break 
c    (-b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧  p_606) -> break
c  in CNF:
c     b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ -p_606 ∨ break
c  in DIMACS:
 23552 -23553  23554 -606 1162 0


c  2-1 --> 1
c    (-b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧ -p_606) -> (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0)
c  in CNF:
c     b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_2
c     b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_1
c     b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨  b^{303, 3}_0
c  in DIMACS:
 23552 -23553  23554  606 -23555 0
 23552 -23553  23554  606 -23556 0
 23552 -23553  23554  606  23557 0

c  1-1 --> 0
c    (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0 ∧ -p_606) -> (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧ -b^{303, 3}_0)
c  in CNF:
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_2
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_1
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_0
c  in DIMACS:
 23552  23553 -23554  606 -23555 0
 23552  23553 -23554  606 -23556 0
 23552  23553 -23554  606 -23557 0

c  0-1 --> -1
c    (-b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧ -p_606) -> ( b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0)
c  in CNF:
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨  b^{303, 3}_2
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_1
c     b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨  b^{303, 3}_0
c  in DIMACS:
 23552  23553  23554  606  23555 0
 23552  23553  23554  606 -23556 0
 23552  23553  23554  606  23557 0

c  -1-1 --> -2
c    ( b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧  b^{303, 2}_0 ∧ -p_606) -> ( b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0)
c  in CNF:
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨  b^{303, 3}_2
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨  b^{303, 3}_1
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨  p_606 ∨ -b^{303, 3}_0
c  in DIMACS:
-23552  23553 -23554  606  23555 0
-23552  23553 -23554  606  23556 0
-23552  23553 -23554  606 -23557 0

c  -2-1 --> break 
c    ( b^{303, 2}_2 ∧  b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧ -p_606) -> break
c  in CNF:
c    -b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨  b^{303, 2}_0 ∨  p_606 ∨ break
c  in DIMACS:
-23552 -23553  23554  606 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{303, 2}_2 ∧ -b^{303, 2}_1 ∧ -b^{303, 2}_0 ∧ true) 
c  in CNF:
c    -b^{303, 2}_2 ∨  b^{303, 2}_1 ∨  b^{303, 2}_0 ∨ false 
c  in DIMACS:
-23552  23553  23554  0

c  3 does not represent an automaton state.
c    -(-b^{303, 2}_2 ∧  b^{303, 2}_1 ∧  b^{303, 2}_0 ∧ true) 
c  in CNF:
c     b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ false 
c  in DIMACS:
 23552 -23553 -23554  0
c  -3 does not represent an automaton state.
c    -( b^{303, 2}_2 ∧  b^{303, 2}_1 ∧  b^{303, 2}_0 ∧ true) 
c  in CNF:
c    -b^{303, 2}_2 ∨ -b^{303, 2}_1 ∨ -b^{303, 2}_0 ∨ false 
c  in DIMACS:
-23552 -23553 -23554  0

c i = 3
c  -2+1 --> -1
c    ( b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧  p_909) -> ( b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧  b^{303, 4}_0)
c  in CNF:
c    -b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨  b^{303, 4}_2
c    -b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_1
c    -b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨  b^{303, 4}_0
c  in DIMACS:
-23555 -23556  23557 -909  23558 0
-23555 -23556  23557 -909 -23559 0
-23555 -23556  23557 -909  23560 0

c  -1+1 --> 0
c    ( b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0 ∧  p_909) -> (-b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧ -b^{303, 4}_0)
c  in CNF:
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_2
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_1
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_0
c  in DIMACS:
-23555  23556 -23557 -909 -23558 0
-23555  23556 -23557 -909 -23559 0
-23555  23556 -23557 -909 -23560 0

c  0+1 --> 1
c    (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧  p_909) -> (-b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧  b^{303, 4}_0)
c  in CNF:
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_2
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_1
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨  b^{303, 4}_0
c  in DIMACS:
 23555  23556  23557 -909 -23558 0
 23555  23556  23557 -909 -23559 0
 23555  23556  23557 -909  23560 0

c  1+1 --> 2
c    (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0 ∧  p_909) -> (-b^{303, 4}_2 ∧  b^{303, 4}_1 ∧ -b^{303, 4}_0)
c  in CNF:
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_2
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨  b^{303, 4}_1
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ -p_909 ∨ -b^{303, 4}_0
c  in DIMACS:
 23555  23556 -23557 -909 -23558 0
 23555  23556 -23557 -909  23559 0
 23555  23556 -23557 -909 -23560 0

c  2+1 --> break 
c    (-b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧  p_909) -> break
c  in CNF:
c     b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ -p_909 ∨ break
c  in DIMACS:
 23555 -23556  23557 -909 1162 0


c  2-1 --> 1
c    (-b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧ -p_909) -> (-b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧  b^{303, 4}_0)
c  in CNF:
c     b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_2
c     b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_1
c     b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨  b^{303, 4}_0
c  in DIMACS:
 23555 -23556  23557  909 -23558 0
 23555 -23556  23557  909 -23559 0
 23555 -23556  23557  909  23560 0

c  1-1 --> 0
c    (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0 ∧ -p_909) -> (-b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧ -b^{303, 4}_0)
c  in CNF:
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_2
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_1
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_0
c  in DIMACS:
 23555  23556 -23557  909 -23558 0
 23555  23556 -23557  909 -23559 0
 23555  23556 -23557  909 -23560 0

c  0-1 --> -1
c    (-b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧ -p_909) -> ( b^{303, 4}_2 ∧ -b^{303, 4}_1 ∧  b^{303, 4}_0)
c  in CNF:
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨  b^{303, 4}_2
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_1
c     b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨  b^{303, 4}_0
c  in DIMACS:
 23555  23556  23557  909  23558 0
 23555  23556  23557  909 -23559 0
 23555  23556  23557  909  23560 0

c  -1-1 --> -2
c    ( b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧  b^{303, 3}_0 ∧ -p_909) -> ( b^{303, 4}_2 ∧  b^{303, 4}_1 ∧ -b^{303, 4}_0)
c  in CNF:
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨  b^{303, 4}_2
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨  b^{303, 4}_1
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨  p_909 ∨ -b^{303, 4}_0
c  in DIMACS:
-23555  23556 -23557  909  23558 0
-23555  23556 -23557  909  23559 0
-23555  23556 -23557  909 -23560 0

c  -2-1 --> break 
c    ( b^{303, 3}_2 ∧  b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧ -p_909) -> break
c  in CNF:
c    -b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨  b^{303, 3}_0 ∨  p_909 ∨ break
c  in DIMACS:
-23555 -23556  23557  909 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{303, 3}_2 ∧ -b^{303, 3}_1 ∧ -b^{303, 3}_0 ∧ true) 
c  in CNF:
c    -b^{303, 3}_2 ∨  b^{303, 3}_1 ∨  b^{303, 3}_0 ∨ false 
c  in DIMACS:
-23555  23556  23557  0

c  3 does not represent an automaton state.
c    -(-b^{303, 3}_2 ∧  b^{303, 3}_1 ∧  b^{303, 3}_0 ∧ true) 
c  in CNF:
c     b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ false 
c  in DIMACS:
 23555 -23556 -23557  0
c  -3 does not represent an automaton state.
c    -( b^{303, 3}_2 ∧  b^{303, 3}_1 ∧  b^{303, 3}_0 ∧ true) 
c  in CNF:
c    -b^{303, 3}_2 ∨ -b^{303, 3}_1 ∨ -b^{303, 3}_0 ∨ false 
c  in DIMACS:
-23555 -23556 -23557  0

c INIT for k = 304
c    -b^{304, 1}_2
c    -b^{304, 1}_1
c    -b^{304, 1}_0
c  in DIMACS:
-23561 0
-23562 0
-23563 0

c Transitions for k = 304
c i = 1
c  -2+1 --> -1
c    ( b^{304, 1}_2 ∧  b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧  p_304) -> ( b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0)
c  in CNF:
c    -b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨  b^{304, 2}_2
c    -b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_1
c    -b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨  b^{304, 2}_0
c  in DIMACS:
-23561 -23562  23563 -304  23564 0
-23561 -23562  23563 -304 -23565 0
-23561 -23562  23563 -304  23566 0

c  -1+1 --> 0
c    ( b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧  b^{304, 1}_0 ∧  p_304) -> (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧ -b^{304, 2}_0)
c  in CNF:
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_2
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_1
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_0
c  in DIMACS:
-23561  23562 -23563 -304 -23564 0
-23561  23562 -23563 -304 -23565 0
-23561  23562 -23563 -304 -23566 0

c  0+1 --> 1
c    (-b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧  p_304) -> (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0)
c  in CNF:
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_2
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_1
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨  b^{304, 2}_0
c  in DIMACS:
 23561  23562  23563 -304 -23564 0
 23561  23562  23563 -304 -23565 0
 23561  23562  23563 -304  23566 0

c  1+1 --> 2
c    (-b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧  b^{304, 1}_0 ∧  p_304) -> (-b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0)
c  in CNF:
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_2
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨  b^{304, 2}_1
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ -p_304 ∨ -b^{304, 2}_0
c  in DIMACS:
 23561  23562 -23563 -304 -23564 0
 23561  23562 -23563 -304  23565 0
 23561  23562 -23563 -304 -23566 0

c  2+1 --> break 
c    (-b^{304, 1}_2 ∧  b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧  p_304) -> break
c  in CNF:
c     b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ -p_304 ∨ break
c  in DIMACS:
 23561 -23562  23563 -304 1162 0


c  2-1 --> 1
c    (-b^{304, 1}_2 ∧  b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧ -p_304) -> (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0)
c  in CNF:
c     b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_2
c     b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_1
c     b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨  b^{304, 2}_0
c  in DIMACS:
 23561 -23562  23563  304 -23564 0
 23561 -23562  23563  304 -23565 0
 23561 -23562  23563  304  23566 0

c  1-1 --> 0
c    (-b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧  b^{304, 1}_0 ∧ -p_304) -> (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧ -b^{304, 2}_0)
c  in CNF:
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_2
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_1
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_0
c  in DIMACS:
 23561  23562 -23563  304 -23564 0
 23561  23562 -23563  304 -23565 0
 23561  23562 -23563  304 -23566 0

c  0-1 --> -1
c    (-b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧ -p_304) -> ( b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0)
c  in CNF:
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨  b^{304, 2}_2
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_1
c     b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨  b^{304, 2}_0
c  in DIMACS:
 23561  23562  23563  304  23564 0
 23561  23562  23563  304 -23565 0
 23561  23562  23563  304  23566 0

c  -1-1 --> -2
c    ( b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧  b^{304, 1}_0 ∧ -p_304) -> ( b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0)
c  in CNF:
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨  b^{304, 2}_2
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨  b^{304, 2}_1
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨  p_304 ∨ -b^{304, 2}_0
c  in DIMACS:
-23561  23562 -23563  304  23564 0
-23561  23562 -23563  304  23565 0
-23561  23562 -23563  304 -23566 0

c  -2-1 --> break 
c    ( b^{304, 1}_2 ∧  b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧ -p_304) -> break
c  in CNF:
c    -b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨  b^{304, 1}_0 ∨  p_304 ∨ break
c  in DIMACS:
-23561 -23562  23563  304 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{304, 1}_2 ∧ -b^{304, 1}_1 ∧ -b^{304, 1}_0 ∧ true) 
c  in CNF:
c    -b^{304, 1}_2 ∨  b^{304, 1}_1 ∨  b^{304, 1}_0 ∨ false 
c  in DIMACS:
-23561  23562  23563  0

c  3 does not represent an automaton state.
c    -(-b^{304, 1}_2 ∧  b^{304, 1}_1 ∧  b^{304, 1}_0 ∧ true) 
c  in CNF:
c     b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ false 
c  in DIMACS:
 23561 -23562 -23563  0
c  -3 does not represent an automaton state.
c    -( b^{304, 1}_2 ∧  b^{304, 1}_1 ∧  b^{304, 1}_0 ∧ true) 
c  in CNF:
c    -b^{304, 1}_2 ∨ -b^{304, 1}_1 ∨ -b^{304, 1}_0 ∨ false 
c  in DIMACS:
-23561 -23562 -23563  0

c i = 2
c  -2+1 --> -1
c    ( b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧  p_608) -> ( b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0)
c  in CNF:
c    -b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨  b^{304, 3}_2
c    -b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_1
c    -b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨  b^{304, 3}_0
c  in DIMACS:
-23564 -23565  23566 -608  23567 0
-23564 -23565  23566 -608 -23568 0
-23564 -23565  23566 -608  23569 0

c  -1+1 --> 0
c    ( b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0 ∧  p_608) -> (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧ -b^{304, 3}_0)
c  in CNF:
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_2
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_1
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_0
c  in DIMACS:
-23564  23565 -23566 -608 -23567 0
-23564  23565 -23566 -608 -23568 0
-23564  23565 -23566 -608 -23569 0

c  0+1 --> 1
c    (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧  p_608) -> (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0)
c  in CNF:
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_2
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_1
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨  b^{304, 3}_0
c  in DIMACS:
 23564  23565  23566 -608 -23567 0
 23564  23565  23566 -608 -23568 0
 23564  23565  23566 -608  23569 0

c  1+1 --> 2
c    (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0 ∧  p_608) -> (-b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0)
c  in CNF:
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_2
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨  b^{304, 3}_1
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ -p_608 ∨ -b^{304, 3}_0
c  in DIMACS:
 23564  23565 -23566 -608 -23567 0
 23564  23565 -23566 -608  23568 0
 23564  23565 -23566 -608 -23569 0

c  2+1 --> break 
c    (-b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧  p_608) -> break
c  in CNF:
c     b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ -p_608 ∨ break
c  in DIMACS:
 23564 -23565  23566 -608 1162 0


c  2-1 --> 1
c    (-b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧ -p_608) -> (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0)
c  in CNF:
c     b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_2
c     b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_1
c     b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨  b^{304, 3}_0
c  in DIMACS:
 23564 -23565  23566  608 -23567 0
 23564 -23565  23566  608 -23568 0
 23564 -23565  23566  608  23569 0

c  1-1 --> 0
c    (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0 ∧ -p_608) -> (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧ -b^{304, 3}_0)
c  in CNF:
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_2
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_1
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_0
c  in DIMACS:
 23564  23565 -23566  608 -23567 0
 23564  23565 -23566  608 -23568 0
 23564  23565 -23566  608 -23569 0

c  0-1 --> -1
c    (-b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧ -p_608) -> ( b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0)
c  in CNF:
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨  b^{304, 3}_2
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_1
c     b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨  b^{304, 3}_0
c  in DIMACS:
 23564  23565  23566  608  23567 0
 23564  23565  23566  608 -23568 0
 23564  23565  23566  608  23569 0

c  -1-1 --> -2
c    ( b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧  b^{304, 2}_0 ∧ -p_608) -> ( b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0)
c  in CNF:
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨  b^{304, 3}_2
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨  b^{304, 3}_1
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨  p_608 ∨ -b^{304, 3}_0
c  in DIMACS:
-23564  23565 -23566  608  23567 0
-23564  23565 -23566  608  23568 0
-23564  23565 -23566  608 -23569 0

c  -2-1 --> break 
c    ( b^{304, 2}_2 ∧  b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧ -p_608) -> break
c  in CNF:
c    -b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨  b^{304, 2}_0 ∨  p_608 ∨ break
c  in DIMACS:
-23564 -23565  23566  608 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{304, 2}_2 ∧ -b^{304, 2}_1 ∧ -b^{304, 2}_0 ∧ true) 
c  in CNF:
c    -b^{304, 2}_2 ∨  b^{304, 2}_1 ∨  b^{304, 2}_0 ∨ false 
c  in DIMACS:
-23564  23565  23566  0

c  3 does not represent an automaton state.
c    -(-b^{304, 2}_2 ∧  b^{304, 2}_1 ∧  b^{304, 2}_0 ∧ true) 
c  in CNF:
c     b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ false 
c  in DIMACS:
 23564 -23565 -23566  0
c  -3 does not represent an automaton state.
c    -( b^{304, 2}_2 ∧  b^{304, 2}_1 ∧  b^{304, 2}_0 ∧ true) 
c  in CNF:
c    -b^{304, 2}_2 ∨ -b^{304, 2}_1 ∨ -b^{304, 2}_0 ∨ false 
c  in DIMACS:
-23564 -23565 -23566  0

c i = 3
c  -2+1 --> -1
c    ( b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧  p_912) -> ( b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧  b^{304, 4}_0)
c  in CNF:
c    -b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨  b^{304, 4}_2
c    -b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_1
c    -b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨  b^{304, 4}_0
c  in DIMACS:
-23567 -23568  23569 -912  23570 0
-23567 -23568  23569 -912 -23571 0
-23567 -23568  23569 -912  23572 0

c  -1+1 --> 0
c    ( b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0 ∧  p_912) -> (-b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧ -b^{304, 4}_0)
c  in CNF:
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_2
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_1
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_0
c  in DIMACS:
-23567  23568 -23569 -912 -23570 0
-23567  23568 -23569 -912 -23571 0
-23567  23568 -23569 -912 -23572 0

c  0+1 --> 1
c    (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧  p_912) -> (-b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧  b^{304, 4}_0)
c  in CNF:
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_2
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_1
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨  b^{304, 4}_0
c  in DIMACS:
 23567  23568  23569 -912 -23570 0
 23567  23568  23569 -912 -23571 0
 23567  23568  23569 -912  23572 0

c  1+1 --> 2
c    (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0 ∧  p_912) -> (-b^{304, 4}_2 ∧  b^{304, 4}_1 ∧ -b^{304, 4}_0)
c  in CNF:
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_2
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨  b^{304, 4}_1
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ -p_912 ∨ -b^{304, 4}_0
c  in DIMACS:
 23567  23568 -23569 -912 -23570 0
 23567  23568 -23569 -912  23571 0
 23567  23568 -23569 -912 -23572 0

c  2+1 --> break 
c    (-b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧  p_912) -> break
c  in CNF:
c     b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ -p_912 ∨ break
c  in DIMACS:
 23567 -23568  23569 -912 1162 0


c  2-1 --> 1
c    (-b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧ -p_912) -> (-b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧  b^{304, 4}_0)
c  in CNF:
c     b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_2
c     b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_1
c     b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨  b^{304, 4}_0
c  in DIMACS:
 23567 -23568  23569  912 -23570 0
 23567 -23568  23569  912 -23571 0
 23567 -23568  23569  912  23572 0

c  1-1 --> 0
c    (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0 ∧ -p_912) -> (-b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧ -b^{304, 4}_0)
c  in CNF:
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_2
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_1
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_0
c  in DIMACS:
 23567  23568 -23569  912 -23570 0
 23567  23568 -23569  912 -23571 0
 23567  23568 -23569  912 -23572 0

c  0-1 --> -1
c    (-b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧ -p_912) -> ( b^{304, 4}_2 ∧ -b^{304, 4}_1 ∧  b^{304, 4}_0)
c  in CNF:
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨  b^{304, 4}_2
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_1
c     b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨  b^{304, 4}_0
c  in DIMACS:
 23567  23568  23569  912  23570 0
 23567  23568  23569  912 -23571 0
 23567  23568  23569  912  23572 0

c  -1-1 --> -2
c    ( b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧  b^{304, 3}_0 ∧ -p_912) -> ( b^{304, 4}_2 ∧  b^{304, 4}_1 ∧ -b^{304, 4}_0)
c  in CNF:
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨  b^{304, 4}_2
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨  b^{304, 4}_1
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨  p_912 ∨ -b^{304, 4}_0
c  in DIMACS:
-23567  23568 -23569  912  23570 0
-23567  23568 -23569  912  23571 0
-23567  23568 -23569  912 -23572 0

c  -2-1 --> break 
c    ( b^{304, 3}_2 ∧  b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧ -p_912) -> break
c  in CNF:
c    -b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨  b^{304, 3}_0 ∨  p_912 ∨ break
c  in DIMACS:
-23567 -23568  23569  912 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{304, 3}_2 ∧ -b^{304, 3}_1 ∧ -b^{304, 3}_0 ∧ true) 
c  in CNF:
c    -b^{304, 3}_2 ∨  b^{304, 3}_1 ∨  b^{304, 3}_0 ∨ false 
c  in DIMACS:
-23567  23568  23569  0

c  3 does not represent an automaton state.
c    -(-b^{304, 3}_2 ∧  b^{304, 3}_1 ∧  b^{304, 3}_0 ∧ true) 
c  in CNF:
c     b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ false 
c  in DIMACS:
 23567 -23568 -23569  0
c  -3 does not represent an automaton state.
c    -( b^{304, 3}_2 ∧  b^{304, 3}_1 ∧  b^{304, 3}_0 ∧ true) 
c  in CNF:
c    -b^{304, 3}_2 ∨ -b^{304, 3}_1 ∨ -b^{304, 3}_0 ∨ false 
c  in DIMACS:
-23567 -23568 -23569  0

c INIT for k = 305
c    -b^{305, 1}_2
c    -b^{305, 1}_1
c    -b^{305, 1}_0
c  in DIMACS:
-23573 0
-23574 0
-23575 0

c Transitions for k = 305
c i = 1
c  -2+1 --> -1
c    ( b^{305, 1}_2 ∧  b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧  p_305) -> ( b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0)
c  in CNF:
c    -b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨  b^{305, 2}_2
c    -b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_1
c    -b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨  b^{305, 2}_0
c  in DIMACS:
-23573 -23574  23575 -305  23576 0
-23573 -23574  23575 -305 -23577 0
-23573 -23574  23575 -305  23578 0

c  -1+1 --> 0
c    ( b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧  b^{305, 1}_0 ∧  p_305) -> (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧ -b^{305, 2}_0)
c  in CNF:
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_2
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_1
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_0
c  in DIMACS:
-23573  23574 -23575 -305 -23576 0
-23573  23574 -23575 -305 -23577 0
-23573  23574 -23575 -305 -23578 0

c  0+1 --> 1
c    (-b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧  p_305) -> (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0)
c  in CNF:
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_2
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_1
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨  b^{305, 2}_0
c  in DIMACS:
 23573  23574  23575 -305 -23576 0
 23573  23574  23575 -305 -23577 0
 23573  23574  23575 -305  23578 0

c  1+1 --> 2
c    (-b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧  b^{305, 1}_0 ∧  p_305) -> (-b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0)
c  in CNF:
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_2
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨  b^{305, 2}_1
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ -p_305 ∨ -b^{305, 2}_0
c  in DIMACS:
 23573  23574 -23575 -305 -23576 0
 23573  23574 -23575 -305  23577 0
 23573  23574 -23575 -305 -23578 0

c  2+1 --> break 
c    (-b^{305, 1}_2 ∧  b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧  p_305) -> break
c  in CNF:
c     b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ -p_305 ∨ break
c  in DIMACS:
 23573 -23574  23575 -305 1162 0


c  2-1 --> 1
c    (-b^{305, 1}_2 ∧  b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧ -p_305) -> (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0)
c  in CNF:
c     b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_2
c     b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_1
c     b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨  b^{305, 2}_0
c  in DIMACS:
 23573 -23574  23575  305 -23576 0
 23573 -23574  23575  305 -23577 0
 23573 -23574  23575  305  23578 0

c  1-1 --> 0
c    (-b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧  b^{305, 1}_0 ∧ -p_305) -> (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧ -b^{305, 2}_0)
c  in CNF:
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_2
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_1
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_0
c  in DIMACS:
 23573  23574 -23575  305 -23576 0
 23573  23574 -23575  305 -23577 0
 23573  23574 -23575  305 -23578 0

c  0-1 --> -1
c    (-b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧ -p_305) -> ( b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0)
c  in CNF:
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨  b^{305, 2}_2
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_1
c     b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨  b^{305, 2}_0
c  in DIMACS:
 23573  23574  23575  305  23576 0
 23573  23574  23575  305 -23577 0
 23573  23574  23575  305  23578 0

c  -1-1 --> -2
c    ( b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧  b^{305, 1}_0 ∧ -p_305) -> ( b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0)
c  in CNF:
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨  b^{305, 2}_2
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨  b^{305, 2}_1
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨  p_305 ∨ -b^{305, 2}_0
c  in DIMACS:
-23573  23574 -23575  305  23576 0
-23573  23574 -23575  305  23577 0
-23573  23574 -23575  305 -23578 0

c  -2-1 --> break 
c    ( b^{305, 1}_2 ∧  b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧ -p_305) -> break
c  in CNF:
c    -b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨  b^{305, 1}_0 ∨  p_305 ∨ break
c  in DIMACS:
-23573 -23574  23575  305 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{305, 1}_2 ∧ -b^{305, 1}_1 ∧ -b^{305, 1}_0 ∧ true) 
c  in CNF:
c    -b^{305, 1}_2 ∨  b^{305, 1}_1 ∨  b^{305, 1}_0 ∨ false 
c  in DIMACS:
-23573  23574  23575  0

c  3 does not represent an automaton state.
c    -(-b^{305, 1}_2 ∧  b^{305, 1}_1 ∧  b^{305, 1}_0 ∧ true) 
c  in CNF:
c     b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ false 
c  in DIMACS:
 23573 -23574 -23575  0
c  -3 does not represent an automaton state.
c    -( b^{305, 1}_2 ∧  b^{305, 1}_1 ∧  b^{305, 1}_0 ∧ true) 
c  in CNF:
c    -b^{305, 1}_2 ∨ -b^{305, 1}_1 ∨ -b^{305, 1}_0 ∨ false 
c  in DIMACS:
-23573 -23574 -23575  0

c i = 2
c  -2+1 --> -1
c    ( b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧  p_610) -> ( b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0)
c  in CNF:
c    -b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨  b^{305, 3}_2
c    -b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_1
c    -b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨  b^{305, 3}_0
c  in DIMACS:
-23576 -23577  23578 -610  23579 0
-23576 -23577  23578 -610 -23580 0
-23576 -23577  23578 -610  23581 0

c  -1+1 --> 0
c    ( b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0 ∧  p_610) -> (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧ -b^{305, 3}_0)
c  in CNF:
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_2
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_1
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_0
c  in DIMACS:
-23576  23577 -23578 -610 -23579 0
-23576  23577 -23578 -610 -23580 0
-23576  23577 -23578 -610 -23581 0

c  0+1 --> 1
c    (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧  p_610) -> (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0)
c  in CNF:
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_2
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_1
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨  b^{305, 3}_0
c  in DIMACS:
 23576  23577  23578 -610 -23579 0
 23576  23577  23578 -610 -23580 0
 23576  23577  23578 -610  23581 0

c  1+1 --> 2
c    (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0 ∧  p_610) -> (-b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0)
c  in CNF:
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_2
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨  b^{305, 3}_1
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ -p_610 ∨ -b^{305, 3}_0
c  in DIMACS:
 23576  23577 -23578 -610 -23579 0
 23576  23577 -23578 -610  23580 0
 23576  23577 -23578 -610 -23581 0

c  2+1 --> break 
c    (-b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧  p_610) -> break
c  in CNF:
c     b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ -p_610 ∨ break
c  in DIMACS:
 23576 -23577  23578 -610 1162 0


c  2-1 --> 1
c    (-b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧ -p_610) -> (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0)
c  in CNF:
c     b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_2
c     b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_1
c     b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨  b^{305, 3}_0
c  in DIMACS:
 23576 -23577  23578  610 -23579 0
 23576 -23577  23578  610 -23580 0
 23576 -23577  23578  610  23581 0

c  1-1 --> 0
c    (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0 ∧ -p_610) -> (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧ -b^{305, 3}_0)
c  in CNF:
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_2
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_1
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_0
c  in DIMACS:
 23576  23577 -23578  610 -23579 0
 23576  23577 -23578  610 -23580 0
 23576  23577 -23578  610 -23581 0

c  0-1 --> -1
c    (-b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧ -p_610) -> ( b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0)
c  in CNF:
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨  b^{305, 3}_2
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_1
c     b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨  b^{305, 3}_0
c  in DIMACS:
 23576  23577  23578  610  23579 0
 23576  23577  23578  610 -23580 0
 23576  23577  23578  610  23581 0

c  -1-1 --> -2
c    ( b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧  b^{305, 2}_0 ∧ -p_610) -> ( b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0)
c  in CNF:
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨  b^{305, 3}_2
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨  b^{305, 3}_1
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨  p_610 ∨ -b^{305, 3}_0
c  in DIMACS:
-23576  23577 -23578  610  23579 0
-23576  23577 -23578  610  23580 0
-23576  23577 -23578  610 -23581 0

c  -2-1 --> break 
c    ( b^{305, 2}_2 ∧  b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧ -p_610) -> break
c  in CNF:
c    -b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨  b^{305, 2}_0 ∨  p_610 ∨ break
c  in DIMACS:
-23576 -23577  23578  610 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{305, 2}_2 ∧ -b^{305, 2}_1 ∧ -b^{305, 2}_0 ∧ true) 
c  in CNF:
c    -b^{305, 2}_2 ∨  b^{305, 2}_1 ∨  b^{305, 2}_0 ∨ false 
c  in DIMACS:
-23576  23577  23578  0

c  3 does not represent an automaton state.
c    -(-b^{305, 2}_2 ∧  b^{305, 2}_1 ∧  b^{305, 2}_0 ∧ true) 
c  in CNF:
c     b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ false 
c  in DIMACS:
 23576 -23577 -23578  0
c  -3 does not represent an automaton state.
c    -( b^{305, 2}_2 ∧  b^{305, 2}_1 ∧  b^{305, 2}_0 ∧ true) 
c  in CNF:
c    -b^{305, 2}_2 ∨ -b^{305, 2}_1 ∨ -b^{305, 2}_0 ∨ false 
c  in DIMACS:
-23576 -23577 -23578  0

c i = 3
c  -2+1 --> -1
c    ( b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧  p_915) -> ( b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧  b^{305, 4}_0)
c  in CNF:
c    -b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨  b^{305, 4}_2
c    -b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_1
c    -b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨  b^{305, 4}_0
c  in DIMACS:
-23579 -23580  23581 -915  23582 0
-23579 -23580  23581 -915 -23583 0
-23579 -23580  23581 -915  23584 0

c  -1+1 --> 0
c    ( b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0 ∧  p_915) -> (-b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧ -b^{305, 4}_0)
c  in CNF:
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_2
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_1
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_0
c  in DIMACS:
-23579  23580 -23581 -915 -23582 0
-23579  23580 -23581 -915 -23583 0
-23579  23580 -23581 -915 -23584 0

c  0+1 --> 1
c    (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧  p_915) -> (-b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧  b^{305, 4}_0)
c  in CNF:
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_2
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_1
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨  b^{305, 4}_0
c  in DIMACS:
 23579  23580  23581 -915 -23582 0
 23579  23580  23581 -915 -23583 0
 23579  23580  23581 -915  23584 0

c  1+1 --> 2
c    (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0 ∧  p_915) -> (-b^{305, 4}_2 ∧  b^{305, 4}_1 ∧ -b^{305, 4}_0)
c  in CNF:
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_2
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨  b^{305, 4}_1
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ -p_915 ∨ -b^{305, 4}_0
c  in DIMACS:
 23579  23580 -23581 -915 -23582 0
 23579  23580 -23581 -915  23583 0
 23579  23580 -23581 -915 -23584 0

c  2+1 --> break 
c    (-b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧  p_915) -> break
c  in CNF:
c     b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ -p_915 ∨ break
c  in DIMACS:
 23579 -23580  23581 -915 1162 0


c  2-1 --> 1
c    (-b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧ -p_915) -> (-b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧  b^{305, 4}_0)
c  in CNF:
c     b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_2
c     b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_1
c     b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨  b^{305, 4}_0
c  in DIMACS:
 23579 -23580  23581  915 -23582 0
 23579 -23580  23581  915 -23583 0
 23579 -23580  23581  915  23584 0

c  1-1 --> 0
c    (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0 ∧ -p_915) -> (-b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧ -b^{305, 4}_0)
c  in CNF:
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_2
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_1
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_0
c  in DIMACS:
 23579  23580 -23581  915 -23582 0
 23579  23580 -23581  915 -23583 0
 23579  23580 -23581  915 -23584 0

c  0-1 --> -1
c    (-b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧ -p_915) -> ( b^{305, 4}_2 ∧ -b^{305, 4}_1 ∧  b^{305, 4}_0)
c  in CNF:
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨  b^{305, 4}_2
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_1
c     b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨  b^{305, 4}_0
c  in DIMACS:
 23579  23580  23581  915  23582 0
 23579  23580  23581  915 -23583 0
 23579  23580  23581  915  23584 0

c  -1-1 --> -2
c    ( b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧  b^{305, 3}_0 ∧ -p_915) -> ( b^{305, 4}_2 ∧  b^{305, 4}_1 ∧ -b^{305, 4}_0)
c  in CNF:
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨  b^{305, 4}_2
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨  b^{305, 4}_1
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨  p_915 ∨ -b^{305, 4}_0
c  in DIMACS:
-23579  23580 -23581  915  23582 0
-23579  23580 -23581  915  23583 0
-23579  23580 -23581  915 -23584 0

c  -2-1 --> break 
c    ( b^{305, 3}_2 ∧  b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧ -p_915) -> break
c  in CNF:
c    -b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨  b^{305, 3}_0 ∨  p_915 ∨ break
c  in DIMACS:
-23579 -23580  23581  915 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{305, 3}_2 ∧ -b^{305, 3}_1 ∧ -b^{305, 3}_0 ∧ true) 
c  in CNF:
c    -b^{305, 3}_2 ∨  b^{305, 3}_1 ∨  b^{305, 3}_0 ∨ false 
c  in DIMACS:
-23579  23580  23581  0

c  3 does not represent an automaton state.
c    -(-b^{305, 3}_2 ∧  b^{305, 3}_1 ∧  b^{305, 3}_0 ∧ true) 
c  in CNF:
c     b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ false 
c  in DIMACS:
 23579 -23580 -23581  0
c  -3 does not represent an automaton state.
c    -( b^{305, 3}_2 ∧  b^{305, 3}_1 ∧  b^{305, 3}_0 ∧ true) 
c  in CNF:
c    -b^{305, 3}_2 ∨ -b^{305, 3}_1 ∨ -b^{305, 3}_0 ∨ false 
c  in DIMACS:
-23579 -23580 -23581  0

c INIT for k = 306
c    -b^{306, 1}_2
c    -b^{306, 1}_1
c    -b^{306, 1}_0
c  in DIMACS:
-23585 0
-23586 0
-23587 0

c Transitions for k = 306
c i = 1
c  -2+1 --> -1
c    ( b^{306, 1}_2 ∧  b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧  p_306) -> ( b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0)
c  in CNF:
c    -b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨  b^{306, 2}_2
c    -b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_1
c    -b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨  b^{306, 2}_0
c  in DIMACS:
-23585 -23586  23587 -306  23588 0
-23585 -23586  23587 -306 -23589 0
-23585 -23586  23587 -306  23590 0

c  -1+1 --> 0
c    ( b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧  b^{306, 1}_0 ∧  p_306) -> (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧ -b^{306, 2}_0)
c  in CNF:
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_2
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_1
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_0
c  in DIMACS:
-23585  23586 -23587 -306 -23588 0
-23585  23586 -23587 -306 -23589 0
-23585  23586 -23587 -306 -23590 0

c  0+1 --> 1
c    (-b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧  p_306) -> (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0)
c  in CNF:
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_2
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_1
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨  b^{306, 2}_0
c  in DIMACS:
 23585  23586  23587 -306 -23588 0
 23585  23586  23587 -306 -23589 0
 23585  23586  23587 -306  23590 0

c  1+1 --> 2
c    (-b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧  b^{306, 1}_0 ∧  p_306) -> (-b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0)
c  in CNF:
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_2
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨  b^{306, 2}_1
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ -p_306 ∨ -b^{306, 2}_0
c  in DIMACS:
 23585  23586 -23587 -306 -23588 0
 23585  23586 -23587 -306  23589 0
 23585  23586 -23587 -306 -23590 0

c  2+1 --> break 
c    (-b^{306, 1}_2 ∧  b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧  p_306) -> break
c  in CNF:
c     b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ -p_306 ∨ break
c  in DIMACS:
 23585 -23586  23587 -306 1162 0


c  2-1 --> 1
c    (-b^{306, 1}_2 ∧  b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧ -p_306) -> (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0)
c  in CNF:
c     b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_2
c     b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_1
c     b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨  b^{306, 2}_0
c  in DIMACS:
 23585 -23586  23587  306 -23588 0
 23585 -23586  23587  306 -23589 0
 23585 -23586  23587  306  23590 0

c  1-1 --> 0
c    (-b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧  b^{306, 1}_0 ∧ -p_306) -> (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧ -b^{306, 2}_0)
c  in CNF:
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_2
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_1
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_0
c  in DIMACS:
 23585  23586 -23587  306 -23588 0
 23585  23586 -23587  306 -23589 0
 23585  23586 -23587  306 -23590 0

c  0-1 --> -1
c    (-b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧ -p_306) -> ( b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0)
c  in CNF:
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨  b^{306, 2}_2
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_1
c     b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨  b^{306, 2}_0
c  in DIMACS:
 23585  23586  23587  306  23588 0
 23585  23586  23587  306 -23589 0
 23585  23586  23587  306  23590 0

c  -1-1 --> -2
c    ( b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧  b^{306, 1}_0 ∧ -p_306) -> ( b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0)
c  in CNF:
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨  b^{306, 2}_2
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨  b^{306, 2}_1
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨  p_306 ∨ -b^{306, 2}_0
c  in DIMACS:
-23585  23586 -23587  306  23588 0
-23585  23586 -23587  306  23589 0
-23585  23586 -23587  306 -23590 0

c  -2-1 --> break 
c    ( b^{306, 1}_2 ∧  b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧ -p_306) -> break
c  in CNF:
c    -b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨  b^{306, 1}_0 ∨  p_306 ∨ break
c  in DIMACS:
-23585 -23586  23587  306 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{306, 1}_2 ∧ -b^{306, 1}_1 ∧ -b^{306, 1}_0 ∧ true) 
c  in CNF:
c    -b^{306, 1}_2 ∨  b^{306, 1}_1 ∨  b^{306, 1}_0 ∨ false 
c  in DIMACS:
-23585  23586  23587  0

c  3 does not represent an automaton state.
c    -(-b^{306, 1}_2 ∧  b^{306, 1}_1 ∧  b^{306, 1}_0 ∧ true) 
c  in CNF:
c     b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ false 
c  in DIMACS:
 23585 -23586 -23587  0
c  -3 does not represent an automaton state.
c    -( b^{306, 1}_2 ∧  b^{306, 1}_1 ∧  b^{306, 1}_0 ∧ true) 
c  in CNF:
c    -b^{306, 1}_2 ∨ -b^{306, 1}_1 ∨ -b^{306, 1}_0 ∨ false 
c  in DIMACS:
-23585 -23586 -23587  0

c i = 2
c  -2+1 --> -1
c    ( b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧  p_612) -> ( b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0)
c  in CNF:
c    -b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨  b^{306, 3}_2
c    -b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_1
c    -b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨  b^{306, 3}_0
c  in DIMACS:
-23588 -23589  23590 -612  23591 0
-23588 -23589  23590 -612 -23592 0
-23588 -23589  23590 -612  23593 0

c  -1+1 --> 0
c    ( b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0 ∧  p_612) -> (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧ -b^{306, 3}_0)
c  in CNF:
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_2
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_1
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_0
c  in DIMACS:
-23588  23589 -23590 -612 -23591 0
-23588  23589 -23590 -612 -23592 0
-23588  23589 -23590 -612 -23593 0

c  0+1 --> 1
c    (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧  p_612) -> (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0)
c  in CNF:
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_2
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_1
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨  b^{306, 3}_0
c  in DIMACS:
 23588  23589  23590 -612 -23591 0
 23588  23589  23590 -612 -23592 0
 23588  23589  23590 -612  23593 0

c  1+1 --> 2
c    (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0 ∧  p_612) -> (-b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0)
c  in CNF:
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_2
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨  b^{306, 3}_1
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ -p_612 ∨ -b^{306, 3}_0
c  in DIMACS:
 23588  23589 -23590 -612 -23591 0
 23588  23589 -23590 -612  23592 0
 23588  23589 -23590 -612 -23593 0

c  2+1 --> break 
c    (-b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧  p_612) -> break
c  in CNF:
c     b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ -p_612 ∨ break
c  in DIMACS:
 23588 -23589  23590 -612 1162 0


c  2-1 --> 1
c    (-b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧ -p_612) -> (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0)
c  in CNF:
c     b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_2
c     b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_1
c     b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨  b^{306, 3}_0
c  in DIMACS:
 23588 -23589  23590  612 -23591 0
 23588 -23589  23590  612 -23592 0
 23588 -23589  23590  612  23593 0

c  1-1 --> 0
c    (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0 ∧ -p_612) -> (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧ -b^{306, 3}_0)
c  in CNF:
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_2
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_1
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_0
c  in DIMACS:
 23588  23589 -23590  612 -23591 0
 23588  23589 -23590  612 -23592 0
 23588  23589 -23590  612 -23593 0

c  0-1 --> -1
c    (-b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧ -p_612) -> ( b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0)
c  in CNF:
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨  b^{306, 3}_2
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_1
c     b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨  b^{306, 3}_0
c  in DIMACS:
 23588  23589  23590  612  23591 0
 23588  23589  23590  612 -23592 0
 23588  23589  23590  612  23593 0

c  -1-1 --> -2
c    ( b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧  b^{306, 2}_0 ∧ -p_612) -> ( b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0)
c  in CNF:
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨  b^{306, 3}_2
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨  b^{306, 3}_1
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨  p_612 ∨ -b^{306, 3}_0
c  in DIMACS:
-23588  23589 -23590  612  23591 0
-23588  23589 -23590  612  23592 0
-23588  23589 -23590  612 -23593 0

c  -2-1 --> break 
c    ( b^{306, 2}_2 ∧  b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧ -p_612) -> break
c  in CNF:
c    -b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨  b^{306, 2}_0 ∨  p_612 ∨ break
c  in DIMACS:
-23588 -23589  23590  612 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{306, 2}_2 ∧ -b^{306, 2}_1 ∧ -b^{306, 2}_0 ∧ true) 
c  in CNF:
c    -b^{306, 2}_2 ∨  b^{306, 2}_1 ∨  b^{306, 2}_0 ∨ false 
c  in DIMACS:
-23588  23589  23590  0

c  3 does not represent an automaton state.
c    -(-b^{306, 2}_2 ∧  b^{306, 2}_1 ∧  b^{306, 2}_0 ∧ true) 
c  in CNF:
c     b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ false 
c  in DIMACS:
 23588 -23589 -23590  0
c  -3 does not represent an automaton state.
c    -( b^{306, 2}_2 ∧  b^{306, 2}_1 ∧  b^{306, 2}_0 ∧ true) 
c  in CNF:
c    -b^{306, 2}_2 ∨ -b^{306, 2}_1 ∨ -b^{306, 2}_0 ∨ false 
c  in DIMACS:
-23588 -23589 -23590  0

c i = 3
c  -2+1 --> -1
c    ( b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧  p_918) -> ( b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧  b^{306, 4}_0)
c  in CNF:
c    -b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨  b^{306, 4}_2
c    -b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_1
c    -b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨  b^{306, 4}_0
c  in DIMACS:
-23591 -23592  23593 -918  23594 0
-23591 -23592  23593 -918 -23595 0
-23591 -23592  23593 -918  23596 0

c  -1+1 --> 0
c    ( b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0 ∧  p_918) -> (-b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧ -b^{306, 4}_0)
c  in CNF:
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_2
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_1
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_0
c  in DIMACS:
-23591  23592 -23593 -918 -23594 0
-23591  23592 -23593 -918 -23595 0
-23591  23592 -23593 -918 -23596 0

c  0+1 --> 1
c    (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧  p_918) -> (-b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧  b^{306, 4}_0)
c  in CNF:
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_2
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_1
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨  b^{306, 4}_0
c  in DIMACS:
 23591  23592  23593 -918 -23594 0
 23591  23592  23593 -918 -23595 0
 23591  23592  23593 -918  23596 0

c  1+1 --> 2
c    (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0 ∧  p_918) -> (-b^{306, 4}_2 ∧  b^{306, 4}_1 ∧ -b^{306, 4}_0)
c  in CNF:
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_2
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨  b^{306, 4}_1
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ -p_918 ∨ -b^{306, 4}_0
c  in DIMACS:
 23591  23592 -23593 -918 -23594 0
 23591  23592 -23593 -918  23595 0
 23591  23592 -23593 -918 -23596 0

c  2+1 --> break 
c    (-b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧  p_918) -> break
c  in CNF:
c     b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ -p_918 ∨ break
c  in DIMACS:
 23591 -23592  23593 -918 1162 0


c  2-1 --> 1
c    (-b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧ -p_918) -> (-b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧  b^{306, 4}_0)
c  in CNF:
c     b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_2
c     b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_1
c     b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨  b^{306, 4}_0
c  in DIMACS:
 23591 -23592  23593  918 -23594 0
 23591 -23592  23593  918 -23595 0
 23591 -23592  23593  918  23596 0

c  1-1 --> 0
c    (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0 ∧ -p_918) -> (-b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧ -b^{306, 4}_0)
c  in CNF:
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_2
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_1
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_0
c  in DIMACS:
 23591  23592 -23593  918 -23594 0
 23591  23592 -23593  918 -23595 0
 23591  23592 -23593  918 -23596 0

c  0-1 --> -1
c    (-b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧ -p_918) -> ( b^{306, 4}_2 ∧ -b^{306, 4}_1 ∧  b^{306, 4}_0)
c  in CNF:
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨  b^{306, 4}_2
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_1
c     b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨  b^{306, 4}_0
c  in DIMACS:
 23591  23592  23593  918  23594 0
 23591  23592  23593  918 -23595 0
 23591  23592  23593  918  23596 0

c  -1-1 --> -2
c    ( b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧  b^{306, 3}_0 ∧ -p_918) -> ( b^{306, 4}_2 ∧  b^{306, 4}_1 ∧ -b^{306, 4}_0)
c  in CNF:
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨  b^{306, 4}_2
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨  b^{306, 4}_1
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨  p_918 ∨ -b^{306, 4}_0
c  in DIMACS:
-23591  23592 -23593  918  23594 0
-23591  23592 -23593  918  23595 0
-23591  23592 -23593  918 -23596 0

c  -2-1 --> break 
c    ( b^{306, 3}_2 ∧  b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧ -p_918) -> break
c  in CNF:
c    -b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨  b^{306, 3}_0 ∨  p_918 ∨ break
c  in DIMACS:
-23591 -23592  23593  918 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{306, 3}_2 ∧ -b^{306, 3}_1 ∧ -b^{306, 3}_0 ∧ true) 
c  in CNF:
c    -b^{306, 3}_2 ∨  b^{306, 3}_1 ∨  b^{306, 3}_0 ∨ false 
c  in DIMACS:
-23591  23592  23593  0

c  3 does not represent an automaton state.
c    -(-b^{306, 3}_2 ∧  b^{306, 3}_1 ∧  b^{306, 3}_0 ∧ true) 
c  in CNF:
c     b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ false 
c  in DIMACS:
 23591 -23592 -23593  0
c  -3 does not represent an automaton state.
c    -( b^{306, 3}_2 ∧  b^{306, 3}_1 ∧  b^{306, 3}_0 ∧ true) 
c  in CNF:
c    -b^{306, 3}_2 ∨ -b^{306, 3}_1 ∨ -b^{306, 3}_0 ∨ false 
c  in DIMACS:
-23591 -23592 -23593  0

c INIT for k = 307
c    -b^{307, 1}_2
c    -b^{307, 1}_1
c    -b^{307, 1}_0
c  in DIMACS:
-23597 0
-23598 0
-23599 0

c Transitions for k = 307
c i = 1
c  -2+1 --> -1
c    ( b^{307, 1}_2 ∧  b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧  p_307) -> ( b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0)
c  in CNF:
c    -b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨  b^{307, 2}_2
c    -b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_1
c    -b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨  b^{307, 2}_0
c  in DIMACS:
-23597 -23598  23599 -307  23600 0
-23597 -23598  23599 -307 -23601 0
-23597 -23598  23599 -307  23602 0

c  -1+1 --> 0
c    ( b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧  b^{307, 1}_0 ∧  p_307) -> (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧ -b^{307, 2}_0)
c  in CNF:
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_2
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_1
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_0
c  in DIMACS:
-23597  23598 -23599 -307 -23600 0
-23597  23598 -23599 -307 -23601 0
-23597  23598 -23599 -307 -23602 0

c  0+1 --> 1
c    (-b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧  p_307) -> (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0)
c  in CNF:
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_2
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_1
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨  b^{307, 2}_0
c  in DIMACS:
 23597  23598  23599 -307 -23600 0
 23597  23598  23599 -307 -23601 0
 23597  23598  23599 -307  23602 0

c  1+1 --> 2
c    (-b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧  b^{307, 1}_0 ∧  p_307) -> (-b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0)
c  in CNF:
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_2
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨  b^{307, 2}_1
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ -p_307 ∨ -b^{307, 2}_0
c  in DIMACS:
 23597  23598 -23599 -307 -23600 0
 23597  23598 -23599 -307  23601 0
 23597  23598 -23599 -307 -23602 0

c  2+1 --> break 
c    (-b^{307, 1}_2 ∧  b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧  p_307) -> break
c  in CNF:
c     b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ -p_307 ∨ break
c  in DIMACS:
 23597 -23598  23599 -307 1162 0


c  2-1 --> 1
c    (-b^{307, 1}_2 ∧  b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧ -p_307) -> (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0)
c  in CNF:
c     b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_2
c     b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_1
c     b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨  b^{307, 2}_0
c  in DIMACS:
 23597 -23598  23599  307 -23600 0
 23597 -23598  23599  307 -23601 0
 23597 -23598  23599  307  23602 0

c  1-1 --> 0
c    (-b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧  b^{307, 1}_0 ∧ -p_307) -> (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧ -b^{307, 2}_0)
c  in CNF:
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_2
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_1
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_0
c  in DIMACS:
 23597  23598 -23599  307 -23600 0
 23597  23598 -23599  307 -23601 0
 23597  23598 -23599  307 -23602 0

c  0-1 --> -1
c    (-b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧ -p_307) -> ( b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0)
c  in CNF:
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨  b^{307, 2}_2
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_1
c     b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨  b^{307, 2}_0
c  in DIMACS:
 23597  23598  23599  307  23600 0
 23597  23598  23599  307 -23601 0
 23597  23598  23599  307  23602 0

c  -1-1 --> -2
c    ( b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧  b^{307, 1}_0 ∧ -p_307) -> ( b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0)
c  in CNF:
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨  b^{307, 2}_2
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨  b^{307, 2}_1
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨  p_307 ∨ -b^{307, 2}_0
c  in DIMACS:
-23597  23598 -23599  307  23600 0
-23597  23598 -23599  307  23601 0
-23597  23598 -23599  307 -23602 0

c  -2-1 --> break 
c    ( b^{307, 1}_2 ∧  b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧ -p_307) -> break
c  in CNF:
c    -b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨  b^{307, 1}_0 ∨  p_307 ∨ break
c  in DIMACS:
-23597 -23598  23599  307 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{307, 1}_2 ∧ -b^{307, 1}_1 ∧ -b^{307, 1}_0 ∧ true) 
c  in CNF:
c    -b^{307, 1}_2 ∨  b^{307, 1}_1 ∨  b^{307, 1}_0 ∨ false 
c  in DIMACS:
-23597  23598  23599  0

c  3 does not represent an automaton state.
c    -(-b^{307, 1}_2 ∧  b^{307, 1}_1 ∧  b^{307, 1}_0 ∧ true) 
c  in CNF:
c     b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ false 
c  in DIMACS:
 23597 -23598 -23599  0
c  -3 does not represent an automaton state.
c    -( b^{307, 1}_2 ∧  b^{307, 1}_1 ∧  b^{307, 1}_0 ∧ true) 
c  in CNF:
c    -b^{307, 1}_2 ∨ -b^{307, 1}_1 ∨ -b^{307, 1}_0 ∨ false 
c  in DIMACS:
-23597 -23598 -23599  0

c i = 2
c  -2+1 --> -1
c    ( b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧  p_614) -> ( b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0)
c  in CNF:
c    -b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨  b^{307, 3}_2
c    -b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_1
c    -b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨  b^{307, 3}_0
c  in DIMACS:
-23600 -23601  23602 -614  23603 0
-23600 -23601  23602 -614 -23604 0
-23600 -23601  23602 -614  23605 0

c  -1+1 --> 0
c    ( b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0 ∧  p_614) -> (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧ -b^{307, 3}_0)
c  in CNF:
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_2
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_1
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_0
c  in DIMACS:
-23600  23601 -23602 -614 -23603 0
-23600  23601 -23602 -614 -23604 0
-23600  23601 -23602 -614 -23605 0

c  0+1 --> 1
c    (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧  p_614) -> (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0)
c  in CNF:
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_2
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_1
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨  b^{307, 3}_0
c  in DIMACS:
 23600  23601  23602 -614 -23603 0
 23600  23601  23602 -614 -23604 0
 23600  23601  23602 -614  23605 0

c  1+1 --> 2
c    (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0 ∧  p_614) -> (-b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0)
c  in CNF:
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_2
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨  b^{307, 3}_1
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ -p_614 ∨ -b^{307, 3}_0
c  in DIMACS:
 23600  23601 -23602 -614 -23603 0
 23600  23601 -23602 -614  23604 0
 23600  23601 -23602 -614 -23605 0

c  2+1 --> break 
c    (-b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧  p_614) -> break
c  in CNF:
c     b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ -p_614 ∨ break
c  in DIMACS:
 23600 -23601  23602 -614 1162 0


c  2-1 --> 1
c    (-b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧ -p_614) -> (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0)
c  in CNF:
c     b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_2
c     b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_1
c     b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨  b^{307, 3}_0
c  in DIMACS:
 23600 -23601  23602  614 -23603 0
 23600 -23601  23602  614 -23604 0
 23600 -23601  23602  614  23605 0

c  1-1 --> 0
c    (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0 ∧ -p_614) -> (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧ -b^{307, 3}_0)
c  in CNF:
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_2
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_1
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_0
c  in DIMACS:
 23600  23601 -23602  614 -23603 0
 23600  23601 -23602  614 -23604 0
 23600  23601 -23602  614 -23605 0

c  0-1 --> -1
c    (-b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧ -p_614) -> ( b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0)
c  in CNF:
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨  b^{307, 3}_2
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_1
c     b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨  b^{307, 3}_0
c  in DIMACS:
 23600  23601  23602  614  23603 0
 23600  23601  23602  614 -23604 0
 23600  23601  23602  614  23605 0

c  -1-1 --> -2
c    ( b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧  b^{307, 2}_0 ∧ -p_614) -> ( b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0)
c  in CNF:
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨  b^{307, 3}_2
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨  b^{307, 3}_1
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨  p_614 ∨ -b^{307, 3}_0
c  in DIMACS:
-23600  23601 -23602  614  23603 0
-23600  23601 -23602  614  23604 0
-23600  23601 -23602  614 -23605 0

c  -2-1 --> break 
c    ( b^{307, 2}_2 ∧  b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧ -p_614) -> break
c  in CNF:
c    -b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨  b^{307, 2}_0 ∨  p_614 ∨ break
c  in DIMACS:
-23600 -23601  23602  614 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{307, 2}_2 ∧ -b^{307, 2}_1 ∧ -b^{307, 2}_0 ∧ true) 
c  in CNF:
c    -b^{307, 2}_2 ∨  b^{307, 2}_1 ∨  b^{307, 2}_0 ∨ false 
c  in DIMACS:
-23600  23601  23602  0

c  3 does not represent an automaton state.
c    -(-b^{307, 2}_2 ∧  b^{307, 2}_1 ∧  b^{307, 2}_0 ∧ true) 
c  in CNF:
c     b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ false 
c  in DIMACS:
 23600 -23601 -23602  0
c  -3 does not represent an automaton state.
c    -( b^{307, 2}_2 ∧  b^{307, 2}_1 ∧  b^{307, 2}_0 ∧ true) 
c  in CNF:
c    -b^{307, 2}_2 ∨ -b^{307, 2}_1 ∨ -b^{307, 2}_0 ∨ false 
c  in DIMACS:
-23600 -23601 -23602  0

c i = 3
c  -2+1 --> -1
c    ( b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧  p_921) -> ( b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧  b^{307, 4}_0)
c  in CNF:
c    -b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨  b^{307, 4}_2
c    -b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_1
c    -b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨  b^{307, 4}_0
c  in DIMACS:
-23603 -23604  23605 -921  23606 0
-23603 -23604  23605 -921 -23607 0
-23603 -23604  23605 -921  23608 0

c  -1+1 --> 0
c    ( b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0 ∧  p_921) -> (-b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧ -b^{307, 4}_0)
c  in CNF:
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_2
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_1
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_0
c  in DIMACS:
-23603  23604 -23605 -921 -23606 0
-23603  23604 -23605 -921 -23607 0
-23603  23604 -23605 -921 -23608 0

c  0+1 --> 1
c    (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧  p_921) -> (-b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧  b^{307, 4}_0)
c  in CNF:
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_2
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_1
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨  b^{307, 4}_0
c  in DIMACS:
 23603  23604  23605 -921 -23606 0
 23603  23604  23605 -921 -23607 0
 23603  23604  23605 -921  23608 0

c  1+1 --> 2
c    (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0 ∧  p_921) -> (-b^{307, 4}_2 ∧  b^{307, 4}_1 ∧ -b^{307, 4}_0)
c  in CNF:
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_2
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨  b^{307, 4}_1
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ -p_921 ∨ -b^{307, 4}_0
c  in DIMACS:
 23603  23604 -23605 -921 -23606 0
 23603  23604 -23605 -921  23607 0
 23603  23604 -23605 -921 -23608 0

c  2+1 --> break 
c    (-b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧  p_921) -> break
c  in CNF:
c     b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ -p_921 ∨ break
c  in DIMACS:
 23603 -23604  23605 -921 1162 0


c  2-1 --> 1
c    (-b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧ -p_921) -> (-b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧  b^{307, 4}_0)
c  in CNF:
c     b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_2
c     b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_1
c     b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨  b^{307, 4}_0
c  in DIMACS:
 23603 -23604  23605  921 -23606 0
 23603 -23604  23605  921 -23607 0
 23603 -23604  23605  921  23608 0

c  1-1 --> 0
c    (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0 ∧ -p_921) -> (-b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧ -b^{307, 4}_0)
c  in CNF:
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_2
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_1
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_0
c  in DIMACS:
 23603  23604 -23605  921 -23606 0
 23603  23604 -23605  921 -23607 0
 23603  23604 -23605  921 -23608 0

c  0-1 --> -1
c    (-b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧ -p_921) -> ( b^{307, 4}_2 ∧ -b^{307, 4}_1 ∧  b^{307, 4}_0)
c  in CNF:
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨  b^{307, 4}_2
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_1
c     b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨  b^{307, 4}_0
c  in DIMACS:
 23603  23604  23605  921  23606 0
 23603  23604  23605  921 -23607 0
 23603  23604  23605  921  23608 0

c  -1-1 --> -2
c    ( b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧  b^{307, 3}_0 ∧ -p_921) -> ( b^{307, 4}_2 ∧  b^{307, 4}_1 ∧ -b^{307, 4}_0)
c  in CNF:
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨  b^{307, 4}_2
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨  b^{307, 4}_1
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨  p_921 ∨ -b^{307, 4}_0
c  in DIMACS:
-23603  23604 -23605  921  23606 0
-23603  23604 -23605  921  23607 0
-23603  23604 -23605  921 -23608 0

c  -2-1 --> break 
c    ( b^{307, 3}_2 ∧  b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧ -p_921) -> break
c  in CNF:
c    -b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨  b^{307, 3}_0 ∨  p_921 ∨ break
c  in DIMACS:
-23603 -23604  23605  921 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{307, 3}_2 ∧ -b^{307, 3}_1 ∧ -b^{307, 3}_0 ∧ true) 
c  in CNF:
c    -b^{307, 3}_2 ∨  b^{307, 3}_1 ∨  b^{307, 3}_0 ∨ false 
c  in DIMACS:
-23603  23604  23605  0

c  3 does not represent an automaton state.
c    -(-b^{307, 3}_2 ∧  b^{307, 3}_1 ∧  b^{307, 3}_0 ∧ true) 
c  in CNF:
c     b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ false 
c  in DIMACS:
 23603 -23604 -23605  0
c  -3 does not represent an automaton state.
c    -( b^{307, 3}_2 ∧  b^{307, 3}_1 ∧  b^{307, 3}_0 ∧ true) 
c  in CNF:
c    -b^{307, 3}_2 ∨ -b^{307, 3}_1 ∨ -b^{307, 3}_0 ∨ false 
c  in DIMACS:
-23603 -23604 -23605  0

c INIT for k = 308
c    -b^{308, 1}_2
c    -b^{308, 1}_1
c    -b^{308, 1}_0
c  in DIMACS:
-23609 0
-23610 0
-23611 0

c Transitions for k = 308
c i = 1
c  -2+1 --> -1
c    ( b^{308, 1}_2 ∧  b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧  p_308) -> ( b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0)
c  in CNF:
c    -b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨  b^{308, 2}_2
c    -b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_1
c    -b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨  b^{308, 2}_0
c  in DIMACS:
-23609 -23610  23611 -308  23612 0
-23609 -23610  23611 -308 -23613 0
-23609 -23610  23611 -308  23614 0

c  -1+1 --> 0
c    ( b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧  b^{308, 1}_0 ∧  p_308) -> (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧ -b^{308, 2}_0)
c  in CNF:
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_2
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_1
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_0
c  in DIMACS:
-23609  23610 -23611 -308 -23612 0
-23609  23610 -23611 -308 -23613 0
-23609  23610 -23611 -308 -23614 0

c  0+1 --> 1
c    (-b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧  p_308) -> (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0)
c  in CNF:
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_2
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_1
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨  b^{308, 2}_0
c  in DIMACS:
 23609  23610  23611 -308 -23612 0
 23609  23610  23611 -308 -23613 0
 23609  23610  23611 -308  23614 0

c  1+1 --> 2
c    (-b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧  b^{308, 1}_0 ∧  p_308) -> (-b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0)
c  in CNF:
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_2
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨  b^{308, 2}_1
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ -p_308 ∨ -b^{308, 2}_0
c  in DIMACS:
 23609  23610 -23611 -308 -23612 0
 23609  23610 -23611 -308  23613 0
 23609  23610 -23611 -308 -23614 0

c  2+1 --> break 
c    (-b^{308, 1}_2 ∧  b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧  p_308) -> break
c  in CNF:
c     b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ -p_308 ∨ break
c  in DIMACS:
 23609 -23610  23611 -308 1162 0


c  2-1 --> 1
c    (-b^{308, 1}_2 ∧  b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧ -p_308) -> (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0)
c  in CNF:
c     b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_2
c     b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_1
c     b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨  b^{308, 2}_0
c  in DIMACS:
 23609 -23610  23611  308 -23612 0
 23609 -23610  23611  308 -23613 0
 23609 -23610  23611  308  23614 0

c  1-1 --> 0
c    (-b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧  b^{308, 1}_0 ∧ -p_308) -> (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧ -b^{308, 2}_0)
c  in CNF:
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_2
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_1
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_0
c  in DIMACS:
 23609  23610 -23611  308 -23612 0
 23609  23610 -23611  308 -23613 0
 23609  23610 -23611  308 -23614 0

c  0-1 --> -1
c    (-b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧ -p_308) -> ( b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0)
c  in CNF:
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨  b^{308, 2}_2
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_1
c     b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨  b^{308, 2}_0
c  in DIMACS:
 23609  23610  23611  308  23612 0
 23609  23610  23611  308 -23613 0
 23609  23610  23611  308  23614 0

c  -1-1 --> -2
c    ( b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧  b^{308, 1}_0 ∧ -p_308) -> ( b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0)
c  in CNF:
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨  b^{308, 2}_2
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨  b^{308, 2}_1
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨  p_308 ∨ -b^{308, 2}_0
c  in DIMACS:
-23609  23610 -23611  308  23612 0
-23609  23610 -23611  308  23613 0
-23609  23610 -23611  308 -23614 0

c  -2-1 --> break 
c    ( b^{308, 1}_2 ∧  b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧ -p_308) -> break
c  in CNF:
c    -b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨  b^{308, 1}_0 ∨  p_308 ∨ break
c  in DIMACS:
-23609 -23610  23611  308 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{308, 1}_2 ∧ -b^{308, 1}_1 ∧ -b^{308, 1}_0 ∧ true) 
c  in CNF:
c    -b^{308, 1}_2 ∨  b^{308, 1}_1 ∨  b^{308, 1}_0 ∨ false 
c  in DIMACS:
-23609  23610  23611  0

c  3 does not represent an automaton state.
c    -(-b^{308, 1}_2 ∧  b^{308, 1}_1 ∧  b^{308, 1}_0 ∧ true) 
c  in CNF:
c     b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ false 
c  in DIMACS:
 23609 -23610 -23611  0
c  -3 does not represent an automaton state.
c    -( b^{308, 1}_2 ∧  b^{308, 1}_1 ∧  b^{308, 1}_0 ∧ true) 
c  in CNF:
c    -b^{308, 1}_2 ∨ -b^{308, 1}_1 ∨ -b^{308, 1}_0 ∨ false 
c  in DIMACS:
-23609 -23610 -23611  0

c i = 2
c  -2+1 --> -1
c    ( b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧  p_616) -> ( b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0)
c  in CNF:
c    -b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨  b^{308, 3}_2
c    -b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_1
c    -b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨  b^{308, 3}_0
c  in DIMACS:
-23612 -23613  23614 -616  23615 0
-23612 -23613  23614 -616 -23616 0
-23612 -23613  23614 -616  23617 0

c  -1+1 --> 0
c    ( b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0 ∧  p_616) -> (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧ -b^{308, 3}_0)
c  in CNF:
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_2
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_1
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_0
c  in DIMACS:
-23612  23613 -23614 -616 -23615 0
-23612  23613 -23614 -616 -23616 0
-23612  23613 -23614 -616 -23617 0

c  0+1 --> 1
c    (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧  p_616) -> (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0)
c  in CNF:
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_2
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_1
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨  b^{308, 3}_0
c  in DIMACS:
 23612  23613  23614 -616 -23615 0
 23612  23613  23614 -616 -23616 0
 23612  23613  23614 -616  23617 0

c  1+1 --> 2
c    (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0 ∧  p_616) -> (-b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0)
c  in CNF:
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_2
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨  b^{308, 3}_1
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ -p_616 ∨ -b^{308, 3}_0
c  in DIMACS:
 23612  23613 -23614 -616 -23615 0
 23612  23613 -23614 -616  23616 0
 23612  23613 -23614 -616 -23617 0

c  2+1 --> break 
c    (-b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧  p_616) -> break
c  in CNF:
c     b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ -p_616 ∨ break
c  in DIMACS:
 23612 -23613  23614 -616 1162 0


c  2-1 --> 1
c    (-b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧ -p_616) -> (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0)
c  in CNF:
c     b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_2
c     b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_1
c     b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨  b^{308, 3}_0
c  in DIMACS:
 23612 -23613  23614  616 -23615 0
 23612 -23613  23614  616 -23616 0
 23612 -23613  23614  616  23617 0

c  1-1 --> 0
c    (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0 ∧ -p_616) -> (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧ -b^{308, 3}_0)
c  in CNF:
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_2
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_1
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_0
c  in DIMACS:
 23612  23613 -23614  616 -23615 0
 23612  23613 -23614  616 -23616 0
 23612  23613 -23614  616 -23617 0

c  0-1 --> -1
c    (-b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧ -p_616) -> ( b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0)
c  in CNF:
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨  b^{308, 3}_2
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_1
c     b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨  b^{308, 3}_0
c  in DIMACS:
 23612  23613  23614  616  23615 0
 23612  23613  23614  616 -23616 0
 23612  23613  23614  616  23617 0

c  -1-1 --> -2
c    ( b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧  b^{308, 2}_0 ∧ -p_616) -> ( b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0)
c  in CNF:
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨  b^{308, 3}_2
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨  b^{308, 3}_1
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨  p_616 ∨ -b^{308, 3}_0
c  in DIMACS:
-23612  23613 -23614  616  23615 0
-23612  23613 -23614  616  23616 0
-23612  23613 -23614  616 -23617 0

c  -2-1 --> break 
c    ( b^{308, 2}_2 ∧  b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧ -p_616) -> break
c  in CNF:
c    -b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨  b^{308, 2}_0 ∨  p_616 ∨ break
c  in DIMACS:
-23612 -23613  23614  616 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{308, 2}_2 ∧ -b^{308, 2}_1 ∧ -b^{308, 2}_0 ∧ true) 
c  in CNF:
c    -b^{308, 2}_2 ∨  b^{308, 2}_1 ∨  b^{308, 2}_0 ∨ false 
c  in DIMACS:
-23612  23613  23614  0

c  3 does not represent an automaton state.
c    -(-b^{308, 2}_2 ∧  b^{308, 2}_1 ∧  b^{308, 2}_0 ∧ true) 
c  in CNF:
c     b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ false 
c  in DIMACS:
 23612 -23613 -23614  0
c  -3 does not represent an automaton state.
c    -( b^{308, 2}_2 ∧  b^{308, 2}_1 ∧  b^{308, 2}_0 ∧ true) 
c  in CNF:
c    -b^{308, 2}_2 ∨ -b^{308, 2}_1 ∨ -b^{308, 2}_0 ∨ false 
c  in DIMACS:
-23612 -23613 -23614  0

c i = 3
c  -2+1 --> -1
c    ( b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧  p_924) -> ( b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧  b^{308, 4}_0)
c  in CNF:
c    -b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨  b^{308, 4}_2
c    -b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_1
c    -b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨  b^{308, 4}_0
c  in DIMACS:
-23615 -23616  23617 -924  23618 0
-23615 -23616  23617 -924 -23619 0
-23615 -23616  23617 -924  23620 0

c  -1+1 --> 0
c    ( b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0 ∧  p_924) -> (-b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧ -b^{308, 4}_0)
c  in CNF:
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_2
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_1
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_0
c  in DIMACS:
-23615  23616 -23617 -924 -23618 0
-23615  23616 -23617 -924 -23619 0
-23615  23616 -23617 -924 -23620 0

c  0+1 --> 1
c    (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧  p_924) -> (-b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧  b^{308, 4}_0)
c  in CNF:
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_2
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_1
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨  b^{308, 4}_0
c  in DIMACS:
 23615  23616  23617 -924 -23618 0
 23615  23616  23617 -924 -23619 0
 23615  23616  23617 -924  23620 0

c  1+1 --> 2
c    (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0 ∧  p_924) -> (-b^{308, 4}_2 ∧  b^{308, 4}_1 ∧ -b^{308, 4}_0)
c  in CNF:
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_2
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨  b^{308, 4}_1
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ -p_924 ∨ -b^{308, 4}_0
c  in DIMACS:
 23615  23616 -23617 -924 -23618 0
 23615  23616 -23617 -924  23619 0
 23615  23616 -23617 -924 -23620 0

c  2+1 --> break 
c    (-b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧  p_924) -> break
c  in CNF:
c     b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ -p_924 ∨ break
c  in DIMACS:
 23615 -23616  23617 -924 1162 0


c  2-1 --> 1
c    (-b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧ -p_924) -> (-b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧  b^{308, 4}_0)
c  in CNF:
c     b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_2
c     b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_1
c     b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨  b^{308, 4}_0
c  in DIMACS:
 23615 -23616  23617  924 -23618 0
 23615 -23616  23617  924 -23619 0
 23615 -23616  23617  924  23620 0

c  1-1 --> 0
c    (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0 ∧ -p_924) -> (-b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧ -b^{308, 4}_0)
c  in CNF:
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_2
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_1
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_0
c  in DIMACS:
 23615  23616 -23617  924 -23618 0
 23615  23616 -23617  924 -23619 0
 23615  23616 -23617  924 -23620 0

c  0-1 --> -1
c    (-b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧ -p_924) -> ( b^{308, 4}_2 ∧ -b^{308, 4}_1 ∧  b^{308, 4}_0)
c  in CNF:
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨  b^{308, 4}_2
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_1
c     b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨  b^{308, 4}_0
c  in DIMACS:
 23615  23616  23617  924  23618 0
 23615  23616  23617  924 -23619 0
 23615  23616  23617  924  23620 0

c  -1-1 --> -2
c    ( b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧  b^{308, 3}_0 ∧ -p_924) -> ( b^{308, 4}_2 ∧  b^{308, 4}_1 ∧ -b^{308, 4}_0)
c  in CNF:
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨  b^{308, 4}_2
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨  b^{308, 4}_1
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨  p_924 ∨ -b^{308, 4}_0
c  in DIMACS:
-23615  23616 -23617  924  23618 0
-23615  23616 -23617  924  23619 0
-23615  23616 -23617  924 -23620 0

c  -2-1 --> break 
c    ( b^{308, 3}_2 ∧  b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧ -p_924) -> break
c  in CNF:
c    -b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨  b^{308, 3}_0 ∨  p_924 ∨ break
c  in DIMACS:
-23615 -23616  23617  924 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{308, 3}_2 ∧ -b^{308, 3}_1 ∧ -b^{308, 3}_0 ∧ true) 
c  in CNF:
c    -b^{308, 3}_2 ∨  b^{308, 3}_1 ∨  b^{308, 3}_0 ∨ false 
c  in DIMACS:
-23615  23616  23617  0

c  3 does not represent an automaton state.
c    -(-b^{308, 3}_2 ∧  b^{308, 3}_1 ∧  b^{308, 3}_0 ∧ true) 
c  in CNF:
c     b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ false 
c  in DIMACS:
 23615 -23616 -23617  0
c  -3 does not represent an automaton state.
c    -( b^{308, 3}_2 ∧  b^{308, 3}_1 ∧  b^{308, 3}_0 ∧ true) 
c  in CNF:
c    -b^{308, 3}_2 ∨ -b^{308, 3}_1 ∨ -b^{308, 3}_0 ∨ false 
c  in DIMACS:
-23615 -23616 -23617  0

c INIT for k = 309
c    -b^{309, 1}_2
c    -b^{309, 1}_1
c    -b^{309, 1}_0
c  in DIMACS:
-23621 0
-23622 0
-23623 0

c Transitions for k = 309
c i = 1
c  -2+1 --> -1
c    ( b^{309, 1}_2 ∧  b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧  p_309) -> ( b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0)
c  in CNF:
c    -b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨  b^{309, 2}_2
c    -b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_1
c    -b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨  b^{309, 2}_0
c  in DIMACS:
-23621 -23622  23623 -309  23624 0
-23621 -23622  23623 -309 -23625 0
-23621 -23622  23623 -309  23626 0

c  -1+1 --> 0
c    ( b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧  b^{309, 1}_0 ∧  p_309) -> (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧ -b^{309, 2}_0)
c  in CNF:
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_2
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_1
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_0
c  in DIMACS:
-23621  23622 -23623 -309 -23624 0
-23621  23622 -23623 -309 -23625 0
-23621  23622 -23623 -309 -23626 0

c  0+1 --> 1
c    (-b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧  p_309) -> (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0)
c  in CNF:
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_2
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_1
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨  b^{309, 2}_0
c  in DIMACS:
 23621  23622  23623 -309 -23624 0
 23621  23622  23623 -309 -23625 0
 23621  23622  23623 -309  23626 0

c  1+1 --> 2
c    (-b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧  b^{309, 1}_0 ∧  p_309) -> (-b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0)
c  in CNF:
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_2
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨  b^{309, 2}_1
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ -p_309 ∨ -b^{309, 2}_0
c  in DIMACS:
 23621  23622 -23623 -309 -23624 0
 23621  23622 -23623 -309  23625 0
 23621  23622 -23623 -309 -23626 0

c  2+1 --> break 
c    (-b^{309, 1}_2 ∧  b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧  p_309) -> break
c  in CNF:
c     b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ -p_309 ∨ break
c  in DIMACS:
 23621 -23622  23623 -309 1162 0


c  2-1 --> 1
c    (-b^{309, 1}_2 ∧  b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧ -p_309) -> (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0)
c  in CNF:
c     b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_2
c     b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_1
c     b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨  b^{309, 2}_0
c  in DIMACS:
 23621 -23622  23623  309 -23624 0
 23621 -23622  23623  309 -23625 0
 23621 -23622  23623  309  23626 0

c  1-1 --> 0
c    (-b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧  b^{309, 1}_0 ∧ -p_309) -> (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧ -b^{309, 2}_0)
c  in CNF:
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_2
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_1
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_0
c  in DIMACS:
 23621  23622 -23623  309 -23624 0
 23621  23622 -23623  309 -23625 0
 23621  23622 -23623  309 -23626 0

c  0-1 --> -1
c    (-b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧ -p_309) -> ( b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0)
c  in CNF:
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨  b^{309, 2}_2
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_1
c     b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨  b^{309, 2}_0
c  in DIMACS:
 23621  23622  23623  309  23624 0
 23621  23622  23623  309 -23625 0
 23621  23622  23623  309  23626 0

c  -1-1 --> -2
c    ( b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧  b^{309, 1}_0 ∧ -p_309) -> ( b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0)
c  in CNF:
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨  b^{309, 2}_2
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨  b^{309, 2}_1
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨  p_309 ∨ -b^{309, 2}_0
c  in DIMACS:
-23621  23622 -23623  309  23624 0
-23621  23622 -23623  309  23625 0
-23621  23622 -23623  309 -23626 0

c  -2-1 --> break 
c    ( b^{309, 1}_2 ∧  b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧ -p_309) -> break
c  in CNF:
c    -b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨  b^{309, 1}_0 ∨  p_309 ∨ break
c  in DIMACS:
-23621 -23622  23623  309 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{309, 1}_2 ∧ -b^{309, 1}_1 ∧ -b^{309, 1}_0 ∧ true) 
c  in CNF:
c    -b^{309, 1}_2 ∨  b^{309, 1}_1 ∨  b^{309, 1}_0 ∨ false 
c  in DIMACS:
-23621  23622  23623  0

c  3 does not represent an automaton state.
c    -(-b^{309, 1}_2 ∧  b^{309, 1}_1 ∧  b^{309, 1}_0 ∧ true) 
c  in CNF:
c     b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ false 
c  in DIMACS:
 23621 -23622 -23623  0
c  -3 does not represent an automaton state.
c    -( b^{309, 1}_2 ∧  b^{309, 1}_1 ∧  b^{309, 1}_0 ∧ true) 
c  in CNF:
c    -b^{309, 1}_2 ∨ -b^{309, 1}_1 ∨ -b^{309, 1}_0 ∨ false 
c  in DIMACS:
-23621 -23622 -23623  0

c i = 2
c  -2+1 --> -1
c    ( b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧  p_618) -> ( b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0)
c  in CNF:
c    -b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨  b^{309, 3}_2
c    -b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_1
c    -b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨  b^{309, 3}_0
c  in DIMACS:
-23624 -23625  23626 -618  23627 0
-23624 -23625  23626 -618 -23628 0
-23624 -23625  23626 -618  23629 0

c  -1+1 --> 0
c    ( b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0 ∧  p_618) -> (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧ -b^{309, 3}_0)
c  in CNF:
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_2
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_1
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_0
c  in DIMACS:
-23624  23625 -23626 -618 -23627 0
-23624  23625 -23626 -618 -23628 0
-23624  23625 -23626 -618 -23629 0

c  0+1 --> 1
c    (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧  p_618) -> (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0)
c  in CNF:
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_2
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_1
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨  b^{309, 3}_0
c  in DIMACS:
 23624  23625  23626 -618 -23627 0
 23624  23625  23626 -618 -23628 0
 23624  23625  23626 -618  23629 0

c  1+1 --> 2
c    (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0 ∧  p_618) -> (-b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0)
c  in CNF:
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_2
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨  b^{309, 3}_1
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ -p_618 ∨ -b^{309, 3}_0
c  in DIMACS:
 23624  23625 -23626 -618 -23627 0
 23624  23625 -23626 -618  23628 0
 23624  23625 -23626 -618 -23629 0

c  2+1 --> break 
c    (-b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧  p_618) -> break
c  in CNF:
c     b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ -p_618 ∨ break
c  in DIMACS:
 23624 -23625  23626 -618 1162 0


c  2-1 --> 1
c    (-b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧ -p_618) -> (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0)
c  in CNF:
c     b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_2
c     b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_1
c     b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨  b^{309, 3}_0
c  in DIMACS:
 23624 -23625  23626  618 -23627 0
 23624 -23625  23626  618 -23628 0
 23624 -23625  23626  618  23629 0

c  1-1 --> 0
c    (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0 ∧ -p_618) -> (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧ -b^{309, 3}_0)
c  in CNF:
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_2
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_1
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_0
c  in DIMACS:
 23624  23625 -23626  618 -23627 0
 23624  23625 -23626  618 -23628 0
 23624  23625 -23626  618 -23629 0

c  0-1 --> -1
c    (-b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧ -p_618) -> ( b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0)
c  in CNF:
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨  b^{309, 3}_2
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_1
c     b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨  b^{309, 3}_0
c  in DIMACS:
 23624  23625  23626  618  23627 0
 23624  23625  23626  618 -23628 0
 23624  23625  23626  618  23629 0

c  -1-1 --> -2
c    ( b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧  b^{309, 2}_0 ∧ -p_618) -> ( b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0)
c  in CNF:
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨  b^{309, 3}_2
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨  b^{309, 3}_1
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨  p_618 ∨ -b^{309, 3}_0
c  in DIMACS:
-23624  23625 -23626  618  23627 0
-23624  23625 -23626  618  23628 0
-23624  23625 -23626  618 -23629 0

c  -2-1 --> break 
c    ( b^{309, 2}_2 ∧  b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧ -p_618) -> break
c  in CNF:
c    -b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨  b^{309, 2}_0 ∨  p_618 ∨ break
c  in DIMACS:
-23624 -23625  23626  618 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{309, 2}_2 ∧ -b^{309, 2}_1 ∧ -b^{309, 2}_0 ∧ true) 
c  in CNF:
c    -b^{309, 2}_2 ∨  b^{309, 2}_1 ∨  b^{309, 2}_0 ∨ false 
c  in DIMACS:
-23624  23625  23626  0

c  3 does not represent an automaton state.
c    -(-b^{309, 2}_2 ∧  b^{309, 2}_1 ∧  b^{309, 2}_0 ∧ true) 
c  in CNF:
c     b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ false 
c  in DIMACS:
 23624 -23625 -23626  0
c  -3 does not represent an automaton state.
c    -( b^{309, 2}_2 ∧  b^{309, 2}_1 ∧  b^{309, 2}_0 ∧ true) 
c  in CNF:
c    -b^{309, 2}_2 ∨ -b^{309, 2}_1 ∨ -b^{309, 2}_0 ∨ false 
c  in DIMACS:
-23624 -23625 -23626  0

c i = 3
c  -2+1 --> -1
c    ( b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧  p_927) -> ( b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧  b^{309, 4}_0)
c  in CNF:
c    -b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨  b^{309, 4}_2
c    -b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_1
c    -b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨  b^{309, 4}_0
c  in DIMACS:
-23627 -23628  23629 -927  23630 0
-23627 -23628  23629 -927 -23631 0
-23627 -23628  23629 -927  23632 0

c  -1+1 --> 0
c    ( b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0 ∧  p_927) -> (-b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧ -b^{309, 4}_0)
c  in CNF:
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_2
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_1
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_0
c  in DIMACS:
-23627  23628 -23629 -927 -23630 0
-23627  23628 -23629 -927 -23631 0
-23627  23628 -23629 -927 -23632 0

c  0+1 --> 1
c    (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧  p_927) -> (-b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧  b^{309, 4}_0)
c  in CNF:
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_2
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_1
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨  b^{309, 4}_0
c  in DIMACS:
 23627  23628  23629 -927 -23630 0
 23627  23628  23629 -927 -23631 0
 23627  23628  23629 -927  23632 0

c  1+1 --> 2
c    (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0 ∧  p_927) -> (-b^{309, 4}_2 ∧  b^{309, 4}_1 ∧ -b^{309, 4}_0)
c  in CNF:
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_2
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨  b^{309, 4}_1
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ -p_927 ∨ -b^{309, 4}_0
c  in DIMACS:
 23627  23628 -23629 -927 -23630 0
 23627  23628 -23629 -927  23631 0
 23627  23628 -23629 -927 -23632 0

c  2+1 --> break 
c    (-b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧  p_927) -> break
c  in CNF:
c     b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ -p_927 ∨ break
c  in DIMACS:
 23627 -23628  23629 -927 1162 0


c  2-1 --> 1
c    (-b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧ -p_927) -> (-b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧  b^{309, 4}_0)
c  in CNF:
c     b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_2
c     b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_1
c     b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨  b^{309, 4}_0
c  in DIMACS:
 23627 -23628  23629  927 -23630 0
 23627 -23628  23629  927 -23631 0
 23627 -23628  23629  927  23632 0

c  1-1 --> 0
c    (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0 ∧ -p_927) -> (-b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧ -b^{309, 4}_0)
c  in CNF:
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_2
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_1
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_0
c  in DIMACS:
 23627  23628 -23629  927 -23630 0
 23627  23628 -23629  927 -23631 0
 23627  23628 -23629  927 -23632 0

c  0-1 --> -1
c    (-b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧ -p_927) -> ( b^{309, 4}_2 ∧ -b^{309, 4}_1 ∧  b^{309, 4}_0)
c  in CNF:
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨  b^{309, 4}_2
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_1
c     b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨  b^{309, 4}_0
c  in DIMACS:
 23627  23628  23629  927  23630 0
 23627  23628  23629  927 -23631 0
 23627  23628  23629  927  23632 0

c  -1-1 --> -2
c    ( b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧  b^{309, 3}_0 ∧ -p_927) -> ( b^{309, 4}_2 ∧  b^{309, 4}_1 ∧ -b^{309, 4}_0)
c  in CNF:
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨  b^{309, 4}_2
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨  b^{309, 4}_1
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨  p_927 ∨ -b^{309, 4}_0
c  in DIMACS:
-23627  23628 -23629  927  23630 0
-23627  23628 -23629  927  23631 0
-23627  23628 -23629  927 -23632 0

c  -2-1 --> break 
c    ( b^{309, 3}_2 ∧  b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧ -p_927) -> break
c  in CNF:
c    -b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨  b^{309, 3}_0 ∨  p_927 ∨ break
c  in DIMACS:
-23627 -23628  23629  927 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{309, 3}_2 ∧ -b^{309, 3}_1 ∧ -b^{309, 3}_0 ∧ true) 
c  in CNF:
c    -b^{309, 3}_2 ∨  b^{309, 3}_1 ∨  b^{309, 3}_0 ∨ false 
c  in DIMACS:
-23627  23628  23629  0

c  3 does not represent an automaton state.
c    -(-b^{309, 3}_2 ∧  b^{309, 3}_1 ∧  b^{309, 3}_0 ∧ true) 
c  in CNF:
c     b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ false 
c  in DIMACS:
 23627 -23628 -23629  0
c  -3 does not represent an automaton state.
c    -( b^{309, 3}_2 ∧  b^{309, 3}_1 ∧  b^{309, 3}_0 ∧ true) 
c  in CNF:
c    -b^{309, 3}_2 ∨ -b^{309, 3}_1 ∨ -b^{309, 3}_0 ∨ false 
c  in DIMACS:
-23627 -23628 -23629  0

c INIT for k = 310
c    -b^{310, 1}_2
c    -b^{310, 1}_1
c    -b^{310, 1}_0
c  in DIMACS:
-23633 0
-23634 0
-23635 0

c Transitions for k = 310
c i = 1
c  -2+1 --> -1
c    ( b^{310, 1}_2 ∧  b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧  p_310) -> ( b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0)
c  in CNF:
c    -b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨  b^{310, 2}_2
c    -b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_1
c    -b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨  b^{310, 2}_0
c  in DIMACS:
-23633 -23634  23635 -310  23636 0
-23633 -23634  23635 -310 -23637 0
-23633 -23634  23635 -310  23638 0

c  -1+1 --> 0
c    ( b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧  b^{310, 1}_0 ∧  p_310) -> (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧ -b^{310, 2}_0)
c  in CNF:
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_2
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_1
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_0
c  in DIMACS:
-23633  23634 -23635 -310 -23636 0
-23633  23634 -23635 -310 -23637 0
-23633  23634 -23635 -310 -23638 0

c  0+1 --> 1
c    (-b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧  p_310) -> (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0)
c  in CNF:
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_2
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_1
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨  b^{310, 2}_0
c  in DIMACS:
 23633  23634  23635 -310 -23636 0
 23633  23634  23635 -310 -23637 0
 23633  23634  23635 -310  23638 0

c  1+1 --> 2
c    (-b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧  b^{310, 1}_0 ∧  p_310) -> (-b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0)
c  in CNF:
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_2
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨  b^{310, 2}_1
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ -p_310 ∨ -b^{310, 2}_0
c  in DIMACS:
 23633  23634 -23635 -310 -23636 0
 23633  23634 -23635 -310  23637 0
 23633  23634 -23635 -310 -23638 0

c  2+1 --> break 
c    (-b^{310, 1}_2 ∧  b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧  p_310) -> break
c  in CNF:
c     b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ -p_310 ∨ break
c  in DIMACS:
 23633 -23634  23635 -310 1162 0


c  2-1 --> 1
c    (-b^{310, 1}_2 ∧  b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧ -p_310) -> (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0)
c  in CNF:
c     b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_2
c     b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_1
c     b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨  b^{310, 2}_0
c  in DIMACS:
 23633 -23634  23635  310 -23636 0
 23633 -23634  23635  310 -23637 0
 23633 -23634  23635  310  23638 0

c  1-1 --> 0
c    (-b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧  b^{310, 1}_0 ∧ -p_310) -> (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧ -b^{310, 2}_0)
c  in CNF:
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_2
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_1
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_0
c  in DIMACS:
 23633  23634 -23635  310 -23636 0
 23633  23634 -23635  310 -23637 0
 23633  23634 -23635  310 -23638 0

c  0-1 --> -1
c    (-b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧ -p_310) -> ( b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0)
c  in CNF:
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨  b^{310, 2}_2
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_1
c     b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨  b^{310, 2}_0
c  in DIMACS:
 23633  23634  23635  310  23636 0
 23633  23634  23635  310 -23637 0
 23633  23634  23635  310  23638 0

c  -1-1 --> -2
c    ( b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧  b^{310, 1}_0 ∧ -p_310) -> ( b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0)
c  in CNF:
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨  b^{310, 2}_2
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨  b^{310, 2}_1
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨  p_310 ∨ -b^{310, 2}_0
c  in DIMACS:
-23633  23634 -23635  310  23636 0
-23633  23634 -23635  310  23637 0
-23633  23634 -23635  310 -23638 0

c  -2-1 --> break 
c    ( b^{310, 1}_2 ∧  b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧ -p_310) -> break
c  in CNF:
c    -b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨  b^{310, 1}_0 ∨  p_310 ∨ break
c  in DIMACS:
-23633 -23634  23635  310 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{310, 1}_2 ∧ -b^{310, 1}_1 ∧ -b^{310, 1}_0 ∧ true) 
c  in CNF:
c    -b^{310, 1}_2 ∨  b^{310, 1}_1 ∨  b^{310, 1}_0 ∨ false 
c  in DIMACS:
-23633  23634  23635  0

c  3 does not represent an automaton state.
c    -(-b^{310, 1}_2 ∧  b^{310, 1}_1 ∧  b^{310, 1}_0 ∧ true) 
c  in CNF:
c     b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ false 
c  in DIMACS:
 23633 -23634 -23635  0
c  -3 does not represent an automaton state.
c    -( b^{310, 1}_2 ∧  b^{310, 1}_1 ∧  b^{310, 1}_0 ∧ true) 
c  in CNF:
c    -b^{310, 1}_2 ∨ -b^{310, 1}_1 ∨ -b^{310, 1}_0 ∨ false 
c  in DIMACS:
-23633 -23634 -23635  0

c i = 2
c  -2+1 --> -1
c    ( b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧  p_620) -> ( b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0)
c  in CNF:
c    -b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨  b^{310, 3}_2
c    -b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_1
c    -b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨  b^{310, 3}_0
c  in DIMACS:
-23636 -23637  23638 -620  23639 0
-23636 -23637  23638 -620 -23640 0
-23636 -23637  23638 -620  23641 0

c  -1+1 --> 0
c    ( b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0 ∧  p_620) -> (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧ -b^{310, 3}_0)
c  in CNF:
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_2
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_1
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_0
c  in DIMACS:
-23636  23637 -23638 -620 -23639 0
-23636  23637 -23638 -620 -23640 0
-23636  23637 -23638 -620 -23641 0

c  0+1 --> 1
c    (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧  p_620) -> (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0)
c  in CNF:
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_2
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_1
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨  b^{310, 3}_0
c  in DIMACS:
 23636  23637  23638 -620 -23639 0
 23636  23637  23638 -620 -23640 0
 23636  23637  23638 -620  23641 0

c  1+1 --> 2
c    (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0 ∧  p_620) -> (-b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0)
c  in CNF:
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_2
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨  b^{310, 3}_1
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ -p_620 ∨ -b^{310, 3}_0
c  in DIMACS:
 23636  23637 -23638 -620 -23639 0
 23636  23637 -23638 -620  23640 0
 23636  23637 -23638 -620 -23641 0

c  2+1 --> break 
c    (-b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧  p_620) -> break
c  in CNF:
c     b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ -p_620 ∨ break
c  in DIMACS:
 23636 -23637  23638 -620 1162 0


c  2-1 --> 1
c    (-b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧ -p_620) -> (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0)
c  in CNF:
c     b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_2
c     b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_1
c     b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨  b^{310, 3}_0
c  in DIMACS:
 23636 -23637  23638  620 -23639 0
 23636 -23637  23638  620 -23640 0
 23636 -23637  23638  620  23641 0

c  1-1 --> 0
c    (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0 ∧ -p_620) -> (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧ -b^{310, 3}_0)
c  in CNF:
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_2
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_1
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_0
c  in DIMACS:
 23636  23637 -23638  620 -23639 0
 23636  23637 -23638  620 -23640 0
 23636  23637 -23638  620 -23641 0

c  0-1 --> -1
c    (-b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧ -p_620) -> ( b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0)
c  in CNF:
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨  b^{310, 3}_2
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_1
c     b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨  b^{310, 3}_0
c  in DIMACS:
 23636  23637  23638  620  23639 0
 23636  23637  23638  620 -23640 0
 23636  23637  23638  620  23641 0

c  -1-1 --> -2
c    ( b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧  b^{310, 2}_0 ∧ -p_620) -> ( b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0)
c  in CNF:
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨  b^{310, 3}_2
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨  b^{310, 3}_1
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨  p_620 ∨ -b^{310, 3}_0
c  in DIMACS:
-23636  23637 -23638  620  23639 0
-23636  23637 -23638  620  23640 0
-23636  23637 -23638  620 -23641 0

c  -2-1 --> break 
c    ( b^{310, 2}_2 ∧  b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧ -p_620) -> break
c  in CNF:
c    -b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨  b^{310, 2}_0 ∨  p_620 ∨ break
c  in DIMACS:
-23636 -23637  23638  620 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{310, 2}_2 ∧ -b^{310, 2}_1 ∧ -b^{310, 2}_0 ∧ true) 
c  in CNF:
c    -b^{310, 2}_2 ∨  b^{310, 2}_1 ∨  b^{310, 2}_0 ∨ false 
c  in DIMACS:
-23636  23637  23638  0

c  3 does not represent an automaton state.
c    -(-b^{310, 2}_2 ∧  b^{310, 2}_1 ∧  b^{310, 2}_0 ∧ true) 
c  in CNF:
c     b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ false 
c  in DIMACS:
 23636 -23637 -23638  0
c  -3 does not represent an automaton state.
c    -( b^{310, 2}_2 ∧  b^{310, 2}_1 ∧  b^{310, 2}_0 ∧ true) 
c  in CNF:
c    -b^{310, 2}_2 ∨ -b^{310, 2}_1 ∨ -b^{310, 2}_0 ∨ false 
c  in DIMACS:
-23636 -23637 -23638  0

c i = 3
c  -2+1 --> -1
c    ( b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧  p_930) -> ( b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧  b^{310, 4}_0)
c  in CNF:
c    -b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨  b^{310, 4}_2
c    -b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_1
c    -b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨  b^{310, 4}_0
c  in DIMACS:
-23639 -23640  23641 -930  23642 0
-23639 -23640  23641 -930 -23643 0
-23639 -23640  23641 -930  23644 0

c  -1+1 --> 0
c    ( b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0 ∧  p_930) -> (-b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧ -b^{310, 4}_0)
c  in CNF:
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_2
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_1
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_0
c  in DIMACS:
-23639  23640 -23641 -930 -23642 0
-23639  23640 -23641 -930 -23643 0
-23639  23640 -23641 -930 -23644 0

c  0+1 --> 1
c    (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧  p_930) -> (-b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧  b^{310, 4}_0)
c  in CNF:
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_2
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_1
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨  b^{310, 4}_0
c  in DIMACS:
 23639  23640  23641 -930 -23642 0
 23639  23640  23641 -930 -23643 0
 23639  23640  23641 -930  23644 0

c  1+1 --> 2
c    (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0 ∧  p_930) -> (-b^{310, 4}_2 ∧  b^{310, 4}_1 ∧ -b^{310, 4}_0)
c  in CNF:
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_2
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨  b^{310, 4}_1
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ -p_930 ∨ -b^{310, 4}_0
c  in DIMACS:
 23639  23640 -23641 -930 -23642 0
 23639  23640 -23641 -930  23643 0
 23639  23640 -23641 -930 -23644 0

c  2+1 --> break 
c    (-b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧  p_930) -> break
c  in CNF:
c     b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ -p_930 ∨ break
c  in DIMACS:
 23639 -23640  23641 -930 1162 0


c  2-1 --> 1
c    (-b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧ -p_930) -> (-b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧  b^{310, 4}_0)
c  in CNF:
c     b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_2
c     b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_1
c     b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨  b^{310, 4}_0
c  in DIMACS:
 23639 -23640  23641  930 -23642 0
 23639 -23640  23641  930 -23643 0
 23639 -23640  23641  930  23644 0

c  1-1 --> 0
c    (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0 ∧ -p_930) -> (-b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧ -b^{310, 4}_0)
c  in CNF:
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_2
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_1
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_0
c  in DIMACS:
 23639  23640 -23641  930 -23642 0
 23639  23640 -23641  930 -23643 0
 23639  23640 -23641  930 -23644 0

c  0-1 --> -1
c    (-b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧ -p_930) -> ( b^{310, 4}_2 ∧ -b^{310, 4}_1 ∧  b^{310, 4}_0)
c  in CNF:
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨  b^{310, 4}_2
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_1
c     b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨  b^{310, 4}_0
c  in DIMACS:
 23639  23640  23641  930  23642 0
 23639  23640  23641  930 -23643 0
 23639  23640  23641  930  23644 0

c  -1-1 --> -2
c    ( b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧  b^{310, 3}_0 ∧ -p_930) -> ( b^{310, 4}_2 ∧  b^{310, 4}_1 ∧ -b^{310, 4}_0)
c  in CNF:
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨  b^{310, 4}_2
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨  b^{310, 4}_1
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨  p_930 ∨ -b^{310, 4}_0
c  in DIMACS:
-23639  23640 -23641  930  23642 0
-23639  23640 -23641  930  23643 0
-23639  23640 -23641  930 -23644 0

c  -2-1 --> break 
c    ( b^{310, 3}_2 ∧  b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧ -p_930) -> break
c  in CNF:
c    -b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨  b^{310, 3}_0 ∨  p_930 ∨ break
c  in DIMACS:
-23639 -23640  23641  930 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{310, 3}_2 ∧ -b^{310, 3}_1 ∧ -b^{310, 3}_0 ∧ true) 
c  in CNF:
c    -b^{310, 3}_2 ∨  b^{310, 3}_1 ∨  b^{310, 3}_0 ∨ false 
c  in DIMACS:
-23639  23640  23641  0

c  3 does not represent an automaton state.
c    -(-b^{310, 3}_2 ∧  b^{310, 3}_1 ∧  b^{310, 3}_0 ∧ true) 
c  in CNF:
c     b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ false 
c  in DIMACS:
 23639 -23640 -23641  0
c  -3 does not represent an automaton state.
c    -( b^{310, 3}_2 ∧  b^{310, 3}_1 ∧  b^{310, 3}_0 ∧ true) 
c  in CNF:
c    -b^{310, 3}_2 ∨ -b^{310, 3}_1 ∨ -b^{310, 3}_0 ∨ false 
c  in DIMACS:
-23639 -23640 -23641  0

c INIT for k = 311
c    -b^{311, 1}_2
c    -b^{311, 1}_1
c    -b^{311, 1}_0
c  in DIMACS:
-23645 0
-23646 0
-23647 0

c Transitions for k = 311
c i = 1
c  -2+1 --> -1
c    ( b^{311, 1}_2 ∧  b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧  p_311) -> ( b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0)
c  in CNF:
c    -b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨  b^{311, 2}_2
c    -b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_1
c    -b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨  b^{311, 2}_0
c  in DIMACS:
-23645 -23646  23647 -311  23648 0
-23645 -23646  23647 -311 -23649 0
-23645 -23646  23647 -311  23650 0

c  -1+1 --> 0
c    ( b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧  b^{311, 1}_0 ∧  p_311) -> (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧ -b^{311, 2}_0)
c  in CNF:
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_2
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_1
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_0
c  in DIMACS:
-23645  23646 -23647 -311 -23648 0
-23645  23646 -23647 -311 -23649 0
-23645  23646 -23647 -311 -23650 0

c  0+1 --> 1
c    (-b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧  p_311) -> (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0)
c  in CNF:
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_2
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_1
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨  b^{311, 2}_0
c  in DIMACS:
 23645  23646  23647 -311 -23648 0
 23645  23646  23647 -311 -23649 0
 23645  23646  23647 -311  23650 0

c  1+1 --> 2
c    (-b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧  b^{311, 1}_0 ∧  p_311) -> (-b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0)
c  in CNF:
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_2
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨  b^{311, 2}_1
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ -p_311 ∨ -b^{311, 2}_0
c  in DIMACS:
 23645  23646 -23647 -311 -23648 0
 23645  23646 -23647 -311  23649 0
 23645  23646 -23647 -311 -23650 0

c  2+1 --> break 
c    (-b^{311, 1}_2 ∧  b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧  p_311) -> break
c  in CNF:
c     b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ -p_311 ∨ break
c  in DIMACS:
 23645 -23646  23647 -311 1162 0


c  2-1 --> 1
c    (-b^{311, 1}_2 ∧  b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧ -p_311) -> (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0)
c  in CNF:
c     b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_2
c     b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_1
c     b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨  b^{311, 2}_0
c  in DIMACS:
 23645 -23646  23647  311 -23648 0
 23645 -23646  23647  311 -23649 0
 23645 -23646  23647  311  23650 0

c  1-1 --> 0
c    (-b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧  b^{311, 1}_0 ∧ -p_311) -> (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧ -b^{311, 2}_0)
c  in CNF:
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_2
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_1
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_0
c  in DIMACS:
 23645  23646 -23647  311 -23648 0
 23645  23646 -23647  311 -23649 0
 23645  23646 -23647  311 -23650 0

c  0-1 --> -1
c    (-b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧ -p_311) -> ( b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0)
c  in CNF:
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨  b^{311, 2}_2
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_1
c     b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨  b^{311, 2}_0
c  in DIMACS:
 23645  23646  23647  311  23648 0
 23645  23646  23647  311 -23649 0
 23645  23646  23647  311  23650 0

c  -1-1 --> -2
c    ( b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧  b^{311, 1}_0 ∧ -p_311) -> ( b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0)
c  in CNF:
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨  b^{311, 2}_2
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨  b^{311, 2}_1
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨  p_311 ∨ -b^{311, 2}_0
c  in DIMACS:
-23645  23646 -23647  311  23648 0
-23645  23646 -23647  311  23649 0
-23645  23646 -23647  311 -23650 0

c  -2-1 --> break 
c    ( b^{311, 1}_2 ∧  b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧ -p_311) -> break
c  in CNF:
c    -b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨  b^{311, 1}_0 ∨  p_311 ∨ break
c  in DIMACS:
-23645 -23646  23647  311 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{311, 1}_2 ∧ -b^{311, 1}_1 ∧ -b^{311, 1}_0 ∧ true) 
c  in CNF:
c    -b^{311, 1}_2 ∨  b^{311, 1}_1 ∨  b^{311, 1}_0 ∨ false 
c  in DIMACS:
-23645  23646  23647  0

c  3 does not represent an automaton state.
c    -(-b^{311, 1}_2 ∧  b^{311, 1}_1 ∧  b^{311, 1}_0 ∧ true) 
c  in CNF:
c     b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ false 
c  in DIMACS:
 23645 -23646 -23647  0
c  -3 does not represent an automaton state.
c    -( b^{311, 1}_2 ∧  b^{311, 1}_1 ∧  b^{311, 1}_0 ∧ true) 
c  in CNF:
c    -b^{311, 1}_2 ∨ -b^{311, 1}_1 ∨ -b^{311, 1}_0 ∨ false 
c  in DIMACS:
-23645 -23646 -23647  0

c i = 2
c  -2+1 --> -1
c    ( b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧  p_622) -> ( b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0)
c  in CNF:
c    -b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨  b^{311, 3}_2
c    -b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_1
c    -b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨  b^{311, 3}_0
c  in DIMACS:
-23648 -23649  23650 -622  23651 0
-23648 -23649  23650 -622 -23652 0
-23648 -23649  23650 -622  23653 0

c  -1+1 --> 0
c    ( b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0 ∧  p_622) -> (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧ -b^{311, 3}_0)
c  in CNF:
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_2
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_1
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_0
c  in DIMACS:
-23648  23649 -23650 -622 -23651 0
-23648  23649 -23650 -622 -23652 0
-23648  23649 -23650 -622 -23653 0

c  0+1 --> 1
c    (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧  p_622) -> (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0)
c  in CNF:
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_2
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_1
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨  b^{311, 3}_0
c  in DIMACS:
 23648  23649  23650 -622 -23651 0
 23648  23649  23650 -622 -23652 0
 23648  23649  23650 -622  23653 0

c  1+1 --> 2
c    (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0 ∧  p_622) -> (-b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0)
c  in CNF:
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_2
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨  b^{311, 3}_1
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ -p_622 ∨ -b^{311, 3}_0
c  in DIMACS:
 23648  23649 -23650 -622 -23651 0
 23648  23649 -23650 -622  23652 0
 23648  23649 -23650 -622 -23653 0

c  2+1 --> break 
c    (-b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧  p_622) -> break
c  in CNF:
c     b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ -p_622 ∨ break
c  in DIMACS:
 23648 -23649  23650 -622 1162 0


c  2-1 --> 1
c    (-b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧ -p_622) -> (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0)
c  in CNF:
c     b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_2
c     b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_1
c     b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨  b^{311, 3}_0
c  in DIMACS:
 23648 -23649  23650  622 -23651 0
 23648 -23649  23650  622 -23652 0
 23648 -23649  23650  622  23653 0

c  1-1 --> 0
c    (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0 ∧ -p_622) -> (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧ -b^{311, 3}_0)
c  in CNF:
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_2
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_1
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_0
c  in DIMACS:
 23648  23649 -23650  622 -23651 0
 23648  23649 -23650  622 -23652 0
 23648  23649 -23650  622 -23653 0

c  0-1 --> -1
c    (-b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧ -p_622) -> ( b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0)
c  in CNF:
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨  b^{311, 3}_2
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_1
c     b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨  b^{311, 3}_0
c  in DIMACS:
 23648  23649  23650  622  23651 0
 23648  23649  23650  622 -23652 0
 23648  23649  23650  622  23653 0

c  -1-1 --> -2
c    ( b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧  b^{311, 2}_0 ∧ -p_622) -> ( b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0)
c  in CNF:
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨  b^{311, 3}_2
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨  b^{311, 3}_1
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨  p_622 ∨ -b^{311, 3}_0
c  in DIMACS:
-23648  23649 -23650  622  23651 0
-23648  23649 -23650  622  23652 0
-23648  23649 -23650  622 -23653 0

c  -2-1 --> break 
c    ( b^{311, 2}_2 ∧  b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧ -p_622) -> break
c  in CNF:
c    -b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨  b^{311, 2}_0 ∨  p_622 ∨ break
c  in DIMACS:
-23648 -23649  23650  622 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{311, 2}_2 ∧ -b^{311, 2}_1 ∧ -b^{311, 2}_0 ∧ true) 
c  in CNF:
c    -b^{311, 2}_2 ∨  b^{311, 2}_1 ∨  b^{311, 2}_0 ∨ false 
c  in DIMACS:
-23648  23649  23650  0

c  3 does not represent an automaton state.
c    -(-b^{311, 2}_2 ∧  b^{311, 2}_1 ∧  b^{311, 2}_0 ∧ true) 
c  in CNF:
c     b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ false 
c  in DIMACS:
 23648 -23649 -23650  0
c  -3 does not represent an automaton state.
c    -( b^{311, 2}_2 ∧  b^{311, 2}_1 ∧  b^{311, 2}_0 ∧ true) 
c  in CNF:
c    -b^{311, 2}_2 ∨ -b^{311, 2}_1 ∨ -b^{311, 2}_0 ∨ false 
c  in DIMACS:
-23648 -23649 -23650  0

c i = 3
c  -2+1 --> -1
c    ( b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧  p_933) -> ( b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧  b^{311, 4}_0)
c  in CNF:
c    -b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨  b^{311, 4}_2
c    -b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_1
c    -b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨  b^{311, 4}_0
c  in DIMACS:
-23651 -23652  23653 -933  23654 0
-23651 -23652  23653 -933 -23655 0
-23651 -23652  23653 -933  23656 0

c  -1+1 --> 0
c    ( b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0 ∧  p_933) -> (-b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧ -b^{311, 4}_0)
c  in CNF:
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_2
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_1
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_0
c  in DIMACS:
-23651  23652 -23653 -933 -23654 0
-23651  23652 -23653 -933 -23655 0
-23651  23652 -23653 -933 -23656 0

c  0+1 --> 1
c    (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧  p_933) -> (-b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧  b^{311, 4}_0)
c  in CNF:
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_2
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_1
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨  b^{311, 4}_0
c  in DIMACS:
 23651  23652  23653 -933 -23654 0
 23651  23652  23653 -933 -23655 0
 23651  23652  23653 -933  23656 0

c  1+1 --> 2
c    (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0 ∧  p_933) -> (-b^{311, 4}_2 ∧  b^{311, 4}_1 ∧ -b^{311, 4}_0)
c  in CNF:
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_2
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨  b^{311, 4}_1
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ -p_933 ∨ -b^{311, 4}_0
c  in DIMACS:
 23651  23652 -23653 -933 -23654 0
 23651  23652 -23653 -933  23655 0
 23651  23652 -23653 -933 -23656 0

c  2+1 --> break 
c    (-b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧  p_933) -> break
c  in CNF:
c     b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ -p_933 ∨ break
c  in DIMACS:
 23651 -23652  23653 -933 1162 0


c  2-1 --> 1
c    (-b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧ -p_933) -> (-b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧  b^{311, 4}_0)
c  in CNF:
c     b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_2
c     b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_1
c     b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨  b^{311, 4}_0
c  in DIMACS:
 23651 -23652  23653  933 -23654 0
 23651 -23652  23653  933 -23655 0
 23651 -23652  23653  933  23656 0

c  1-1 --> 0
c    (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0 ∧ -p_933) -> (-b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧ -b^{311, 4}_0)
c  in CNF:
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_2
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_1
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_0
c  in DIMACS:
 23651  23652 -23653  933 -23654 0
 23651  23652 -23653  933 -23655 0
 23651  23652 -23653  933 -23656 0

c  0-1 --> -1
c    (-b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧ -p_933) -> ( b^{311, 4}_2 ∧ -b^{311, 4}_1 ∧  b^{311, 4}_0)
c  in CNF:
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨  b^{311, 4}_2
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_1
c     b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨  b^{311, 4}_0
c  in DIMACS:
 23651  23652  23653  933  23654 0
 23651  23652  23653  933 -23655 0
 23651  23652  23653  933  23656 0

c  -1-1 --> -2
c    ( b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧  b^{311, 3}_0 ∧ -p_933) -> ( b^{311, 4}_2 ∧  b^{311, 4}_1 ∧ -b^{311, 4}_0)
c  in CNF:
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨  b^{311, 4}_2
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨  b^{311, 4}_1
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨  p_933 ∨ -b^{311, 4}_0
c  in DIMACS:
-23651  23652 -23653  933  23654 0
-23651  23652 -23653  933  23655 0
-23651  23652 -23653  933 -23656 0

c  -2-1 --> break 
c    ( b^{311, 3}_2 ∧  b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧ -p_933) -> break
c  in CNF:
c    -b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨  b^{311, 3}_0 ∨  p_933 ∨ break
c  in DIMACS:
-23651 -23652  23653  933 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{311, 3}_2 ∧ -b^{311, 3}_1 ∧ -b^{311, 3}_0 ∧ true) 
c  in CNF:
c    -b^{311, 3}_2 ∨  b^{311, 3}_1 ∨  b^{311, 3}_0 ∨ false 
c  in DIMACS:
-23651  23652  23653  0

c  3 does not represent an automaton state.
c    -(-b^{311, 3}_2 ∧  b^{311, 3}_1 ∧  b^{311, 3}_0 ∧ true) 
c  in CNF:
c     b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ false 
c  in DIMACS:
 23651 -23652 -23653  0
c  -3 does not represent an automaton state.
c    -( b^{311, 3}_2 ∧  b^{311, 3}_1 ∧  b^{311, 3}_0 ∧ true) 
c  in CNF:
c    -b^{311, 3}_2 ∨ -b^{311, 3}_1 ∨ -b^{311, 3}_0 ∨ false 
c  in DIMACS:
-23651 -23652 -23653  0

c INIT for k = 312
c    -b^{312, 1}_2
c    -b^{312, 1}_1
c    -b^{312, 1}_0
c  in DIMACS:
-23657 0
-23658 0
-23659 0

c Transitions for k = 312
c i = 1
c  -2+1 --> -1
c    ( b^{312, 1}_2 ∧  b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧  p_312) -> ( b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0)
c  in CNF:
c    -b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨  b^{312, 2}_2
c    -b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_1
c    -b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨  b^{312, 2}_0
c  in DIMACS:
-23657 -23658  23659 -312  23660 0
-23657 -23658  23659 -312 -23661 0
-23657 -23658  23659 -312  23662 0

c  -1+1 --> 0
c    ( b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧  b^{312, 1}_0 ∧  p_312) -> (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧ -b^{312, 2}_0)
c  in CNF:
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_2
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_1
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_0
c  in DIMACS:
-23657  23658 -23659 -312 -23660 0
-23657  23658 -23659 -312 -23661 0
-23657  23658 -23659 -312 -23662 0

c  0+1 --> 1
c    (-b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧  p_312) -> (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0)
c  in CNF:
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_2
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_1
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨  b^{312, 2}_0
c  in DIMACS:
 23657  23658  23659 -312 -23660 0
 23657  23658  23659 -312 -23661 0
 23657  23658  23659 -312  23662 0

c  1+1 --> 2
c    (-b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧  b^{312, 1}_0 ∧  p_312) -> (-b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0)
c  in CNF:
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_2
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨  b^{312, 2}_1
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ -p_312 ∨ -b^{312, 2}_0
c  in DIMACS:
 23657  23658 -23659 -312 -23660 0
 23657  23658 -23659 -312  23661 0
 23657  23658 -23659 -312 -23662 0

c  2+1 --> break 
c    (-b^{312, 1}_2 ∧  b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧  p_312) -> break
c  in CNF:
c     b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ -p_312 ∨ break
c  in DIMACS:
 23657 -23658  23659 -312 1162 0


c  2-1 --> 1
c    (-b^{312, 1}_2 ∧  b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧ -p_312) -> (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0)
c  in CNF:
c     b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_2
c     b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_1
c     b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨  b^{312, 2}_0
c  in DIMACS:
 23657 -23658  23659  312 -23660 0
 23657 -23658  23659  312 -23661 0
 23657 -23658  23659  312  23662 0

c  1-1 --> 0
c    (-b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧  b^{312, 1}_0 ∧ -p_312) -> (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧ -b^{312, 2}_0)
c  in CNF:
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_2
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_1
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_0
c  in DIMACS:
 23657  23658 -23659  312 -23660 0
 23657  23658 -23659  312 -23661 0
 23657  23658 -23659  312 -23662 0

c  0-1 --> -1
c    (-b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧ -p_312) -> ( b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0)
c  in CNF:
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨  b^{312, 2}_2
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_1
c     b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨  b^{312, 2}_0
c  in DIMACS:
 23657  23658  23659  312  23660 0
 23657  23658  23659  312 -23661 0
 23657  23658  23659  312  23662 0

c  -1-1 --> -2
c    ( b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧  b^{312, 1}_0 ∧ -p_312) -> ( b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0)
c  in CNF:
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨  b^{312, 2}_2
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨  b^{312, 2}_1
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨  p_312 ∨ -b^{312, 2}_0
c  in DIMACS:
-23657  23658 -23659  312  23660 0
-23657  23658 -23659  312  23661 0
-23657  23658 -23659  312 -23662 0

c  -2-1 --> break 
c    ( b^{312, 1}_2 ∧  b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧ -p_312) -> break
c  in CNF:
c    -b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨  b^{312, 1}_0 ∨  p_312 ∨ break
c  in DIMACS:
-23657 -23658  23659  312 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{312, 1}_2 ∧ -b^{312, 1}_1 ∧ -b^{312, 1}_0 ∧ true) 
c  in CNF:
c    -b^{312, 1}_2 ∨  b^{312, 1}_1 ∨  b^{312, 1}_0 ∨ false 
c  in DIMACS:
-23657  23658  23659  0

c  3 does not represent an automaton state.
c    -(-b^{312, 1}_2 ∧  b^{312, 1}_1 ∧  b^{312, 1}_0 ∧ true) 
c  in CNF:
c     b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ false 
c  in DIMACS:
 23657 -23658 -23659  0
c  -3 does not represent an automaton state.
c    -( b^{312, 1}_2 ∧  b^{312, 1}_1 ∧  b^{312, 1}_0 ∧ true) 
c  in CNF:
c    -b^{312, 1}_2 ∨ -b^{312, 1}_1 ∨ -b^{312, 1}_0 ∨ false 
c  in DIMACS:
-23657 -23658 -23659  0

c i = 2
c  -2+1 --> -1
c    ( b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧  p_624) -> ( b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0)
c  in CNF:
c    -b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨  b^{312, 3}_2
c    -b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_1
c    -b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨  b^{312, 3}_0
c  in DIMACS:
-23660 -23661  23662 -624  23663 0
-23660 -23661  23662 -624 -23664 0
-23660 -23661  23662 -624  23665 0

c  -1+1 --> 0
c    ( b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0 ∧  p_624) -> (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧ -b^{312, 3}_0)
c  in CNF:
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_2
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_1
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_0
c  in DIMACS:
-23660  23661 -23662 -624 -23663 0
-23660  23661 -23662 -624 -23664 0
-23660  23661 -23662 -624 -23665 0

c  0+1 --> 1
c    (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧  p_624) -> (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0)
c  in CNF:
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_2
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_1
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨  b^{312, 3}_0
c  in DIMACS:
 23660  23661  23662 -624 -23663 0
 23660  23661  23662 -624 -23664 0
 23660  23661  23662 -624  23665 0

c  1+1 --> 2
c    (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0 ∧  p_624) -> (-b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0)
c  in CNF:
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_2
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨  b^{312, 3}_1
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ -p_624 ∨ -b^{312, 3}_0
c  in DIMACS:
 23660  23661 -23662 -624 -23663 0
 23660  23661 -23662 -624  23664 0
 23660  23661 -23662 -624 -23665 0

c  2+1 --> break 
c    (-b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧  p_624) -> break
c  in CNF:
c     b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ -p_624 ∨ break
c  in DIMACS:
 23660 -23661  23662 -624 1162 0


c  2-1 --> 1
c    (-b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧ -p_624) -> (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0)
c  in CNF:
c     b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_2
c     b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_1
c     b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨  b^{312, 3}_0
c  in DIMACS:
 23660 -23661  23662  624 -23663 0
 23660 -23661  23662  624 -23664 0
 23660 -23661  23662  624  23665 0

c  1-1 --> 0
c    (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0 ∧ -p_624) -> (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧ -b^{312, 3}_0)
c  in CNF:
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_2
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_1
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_0
c  in DIMACS:
 23660  23661 -23662  624 -23663 0
 23660  23661 -23662  624 -23664 0
 23660  23661 -23662  624 -23665 0

c  0-1 --> -1
c    (-b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧ -p_624) -> ( b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0)
c  in CNF:
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨  b^{312, 3}_2
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_1
c     b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨  b^{312, 3}_0
c  in DIMACS:
 23660  23661  23662  624  23663 0
 23660  23661  23662  624 -23664 0
 23660  23661  23662  624  23665 0

c  -1-1 --> -2
c    ( b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧  b^{312, 2}_0 ∧ -p_624) -> ( b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0)
c  in CNF:
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨  b^{312, 3}_2
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨  b^{312, 3}_1
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨  p_624 ∨ -b^{312, 3}_0
c  in DIMACS:
-23660  23661 -23662  624  23663 0
-23660  23661 -23662  624  23664 0
-23660  23661 -23662  624 -23665 0

c  -2-1 --> break 
c    ( b^{312, 2}_2 ∧  b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧ -p_624) -> break
c  in CNF:
c    -b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨  b^{312, 2}_0 ∨  p_624 ∨ break
c  in DIMACS:
-23660 -23661  23662  624 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{312, 2}_2 ∧ -b^{312, 2}_1 ∧ -b^{312, 2}_0 ∧ true) 
c  in CNF:
c    -b^{312, 2}_2 ∨  b^{312, 2}_1 ∨  b^{312, 2}_0 ∨ false 
c  in DIMACS:
-23660  23661  23662  0

c  3 does not represent an automaton state.
c    -(-b^{312, 2}_2 ∧  b^{312, 2}_1 ∧  b^{312, 2}_0 ∧ true) 
c  in CNF:
c     b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ false 
c  in DIMACS:
 23660 -23661 -23662  0
c  -3 does not represent an automaton state.
c    -( b^{312, 2}_2 ∧  b^{312, 2}_1 ∧  b^{312, 2}_0 ∧ true) 
c  in CNF:
c    -b^{312, 2}_2 ∨ -b^{312, 2}_1 ∨ -b^{312, 2}_0 ∨ false 
c  in DIMACS:
-23660 -23661 -23662  0

c i = 3
c  -2+1 --> -1
c    ( b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧  p_936) -> ( b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧  b^{312, 4}_0)
c  in CNF:
c    -b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨  b^{312, 4}_2
c    -b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_1
c    -b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨  b^{312, 4}_0
c  in DIMACS:
-23663 -23664  23665 -936  23666 0
-23663 -23664  23665 -936 -23667 0
-23663 -23664  23665 -936  23668 0

c  -1+1 --> 0
c    ( b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0 ∧  p_936) -> (-b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧ -b^{312, 4}_0)
c  in CNF:
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_2
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_1
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_0
c  in DIMACS:
-23663  23664 -23665 -936 -23666 0
-23663  23664 -23665 -936 -23667 0
-23663  23664 -23665 -936 -23668 0

c  0+1 --> 1
c    (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧  p_936) -> (-b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧  b^{312, 4}_0)
c  in CNF:
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_2
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_1
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨  b^{312, 4}_0
c  in DIMACS:
 23663  23664  23665 -936 -23666 0
 23663  23664  23665 -936 -23667 0
 23663  23664  23665 -936  23668 0

c  1+1 --> 2
c    (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0 ∧  p_936) -> (-b^{312, 4}_2 ∧  b^{312, 4}_1 ∧ -b^{312, 4}_0)
c  in CNF:
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_2
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨  b^{312, 4}_1
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ -p_936 ∨ -b^{312, 4}_0
c  in DIMACS:
 23663  23664 -23665 -936 -23666 0
 23663  23664 -23665 -936  23667 0
 23663  23664 -23665 -936 -23668 0

c  2+1 --> break 
c    (-b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧  p_936) -> break
c  in CNF:
c     b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ -p_936 ∨ break
c  in DIMACS:
 23663 -23664  23665 -936 1162 0


c  2-1 --> 1
c    (-b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧ -p_936) -> (-b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧  b^{312, 4}_0)
c  in CNF:
c     b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_2
c     b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_1
c     b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨  b^{312, 4}_0
c  in DIMACS:
 23663 -23664  23665  936 -23666 0
 23663 -23664  23665  936 -23667 0
 23663 -23664  23665  936  23668 0

c  1-1 --> 0
c    (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0 ∧ -p_936) -> (-b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧ -b^{312, 4}_0)
c  in CNF:
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_2
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_1
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_0
c  in DIMACS:
 23663  23664 -23665  936 -23666 0
 23663  23664 -23665  936 -23667 0
 23663  23664 -23665  936 -23668 0

c  0-1 --> -1
c    (-b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧ -p_936) -> ( b^{312, 4}_2 ∧ -b^{312, 4}_1 ∧  b^{312, 4}_0)
c  in CNF:
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨  b^{312, 4}_2
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_1
c     b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨  b^{312, 4}_0
c  in DIMACS:
 23663  23664  23665  936  23666 0
 23663  23664  23665  936 -23667 0
 23663  23664  23665  936  23668 0

c  -1-1 --> -2
c    ( b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧  b^{312, 3}_0 ∧ -p_936) -> ( b^{312, 4}_2 ∧  b^{312, 4}_1 ∧ -b^{312, 4}_0)
c  in CNF:
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨  b^{312, 4}_2
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨  b^{312, 4}_1
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨  p_936 ∨ -b^{312, 4}_0
c  in DIMACS:
-23663  23664 -23665  936  23666 0
-23663  23664 -23665  936  23667 0
-23663  23664 -23665  936 -23668 0

c  -2-1 --> break 
c    ( b^{312, 3}_2 ∧  b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧ -p_936) -> break
c  in CNF:
c    -b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨  b^{312, 3}_0 ∨  p_936 ∨ break
c  in DIMACS:
-23663 -23664  23665  936 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{312, 3}_2 ∧ -b^{312, 3}_1 ∧ -b^{312, 3}_0 ∧ true) 
c  in CNF:
c    -b^{312, 3}_2 ∨  b^{312, 3}_1 ∨  b^{312, 3}_0 ∨ false 
c  in DIMACS:
-23663  23664  23665  0

c  3 does not represent an automaton state.
c    -(-b^{312, 3}_2 ∧  b^{312, 3}_1 ∧  b^{312, 3}_0 ∧ true) 
c  in CNF:
c     b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ false 
c  in DIMACS:
 23663 -23664 -23665  0
c  -3 does not represent an automaton state.
c    -( b^{312, 3}_2 ∧  b^{312, 3}_1 ∧  b^{312, 3}_0 ∧ true) 
c  in CNF:
c    -b^{312, 3}_2 ∨ -b^{312, 3}_1 ∨ -b^{312, 3}_0 ∨ false 
c  in DIMACS:
-23663 -23664 -23665  0

c INIT for k = 313
c    -b^{313, 1}_2
c    -b^{313, 1}_1
c    -b^{313, 1}_0
c  in DIMACS:
-23669 0
-23670 0
-23671 0

c Transitions for k = 313
c i = 1
c  -2+1 --> -1
c    ( b^{313, 1}_2 ∧  b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧  p_313) -> ( b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0)
c  in CNF:
c    -b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨  b^{313, 2}_2
c    -b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_1
c    -b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨  b^{313, 2}_0
c  in DIMACS:
-23669 -23670  23671 -313  23672 0
-23669 -23670  23671 -313 -23673 0
-23669 -23670  23671 -313  23674 0

c  -1+1 --> 0
c    ( b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧  b^{313, 1}_0 ∧  p_313) -> (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧ -b^{313, 2}_0)
c  in CNF:
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_2
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_1
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_0
c  in DIMACS:
-23669  23670 -23671 -313 -23672 0
-23669  23670 -23671 -313 -23673 0
-23669  23670 -23671 -313 -23674 0

c  0+1 --> 1
c    (-b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧  p_313) -> (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0)
c  in CNF:
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_2
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_1
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨  b^{313, 2}_0
c  in DIMACS:
 23669  23670  23671 -313 -23672 0
 23669  23670  23671 -313 -23673 0
 23669  23670  23671 -313  23674 0

c  1+1 --> 2
c    (-b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧  b^{313, 1}_0 ∧  p_313) -> (-b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0)
c  in CNF:
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_2
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨  b^{313, 2}_1
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ -p_313 ∨ -b^{313, 2}_0
c  in DIMACS:
 23669  23670 -23671 -313 -23672 0
 23669  23670 -23671 -313  23673 0
 23669  23670 -23671 -313 -23674 0

c  2+1 --> break 
c    (-b^{313, 1}_2 ∧  b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧  p_313) -> break
c  in CNF:
c     b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ -p_313 ∨ break
c  in DIMACS:
 23669 -23670  23671 -313 1162 0


c  2-1 --> 1
c    (-b^{313, 1}_2 ∧  b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧ -p_313) -> (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0)
c  in CNF:
c     b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_2
c     b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_1
c     b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨  b^{313, 2}_0
c  in DIMACS:
 23669 -23670  23671  313 -23672 0
 23669 -23670  23671  313 -23673 0
 23669 -23670  23671  313  23674 0

c  1-1 --> 0
c    (-b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧  b^{313, 1}_0 ∧ -p_313) -> (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧ -b^{313, 2}_0)
c  in CNF:
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_2
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_1
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_0
c  in DIMACS:
 23669  23670 -23671  313 -23672 0
 23669  23670 -23671  313 -23673 0
 23669  23670 -23671  313 -23674 0

c  0-1 --> -1
c    (-b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧ -p_313) -> ( b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0)
c  in CNF:
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨  b^{313, 2}_2
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_1
c     b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨  b^{313, 2}_0
c  in DIMACS:
 23669  23670  23671  313  23672 0
 23669  23670  23671  313 -23673 0
 23669  23670  23671  313  23674 0

c  -1-1 --> -2
c    ( b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧  b^{313, 1}_0 ∧ -p_313) -> ( b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0)
c  in CNF:
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨  b^{313, 2}_2
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨  b^{313, 2}_1
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨  p_313 ∨ -b^{313, 2}_0
c  in DIMACS:
-23669  23670 -23671  313  23672 0
-23669  23670 -23671  313  23673 0
-23669  23670 -23671  313 -23674 0

c  -2-1 --> break 
c    ( b^{313, 1}_2 ∧  b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧ -p_313) -> break
c  in CNF:
c    -b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨  b^{313, 1}_0 ∨  p_313 ∨ break
c  in DIMACS:
-23669 -23670  23671  313 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{313, 1}_2 ∧ -b^{313, 1}_1 ∧ -b^{313, 1}_0 ∧ true) 
c  in CNF:
c    -b^{313, 1}_2 ∨  b^{313, 1}_1 ∨  b^{313, 1}_0 ∨ false 
c  in DIMACS:
-23669  23670  23671  0

c  3 does not represent an automaton state.
c    -(-b^{313, 1}_2 ∧  b^{313, 1}_1 ∧  b^{313, 1}_0 ∧ true) 
c  in CNF:
c     b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ false 
c  in DIMACS:
 23669 -23670 -23671  0
c  -3 does not represent an automaton state.
c    -( b^{313, 1}_2 ∧  b^{313, 1}_1 ∧  b^{313, 1}_0 ∧ true) 
c  in CNF:
c    -b^{313, 1}_2 ∨ -b^{313, 1}_1 ∨ -b^{313, 1}_0 ∨ false 
c  in DIMACS:
-23669 -23670 -23671  0

c i = 2
c  -2+1 --> -1
c    ( b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧  p_626) -> ( b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0)
c  in CNF:
c    -b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨  b^{313, 3}_2
c    -b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_1
c    -b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨  b^{313, 3}_0
c  in DIMACS:
-23672 -23673  23674 -626  23675 0
-23672 -23673  23674 -626 -23676 0
-23672 -23673  23674 -626  23677 0

c  -1+1 --> 0
c    ( b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0 ∧  p_626) -> (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧ -b^{313, 3}_0)
c  in CNF:
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_2
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_1
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_0
c  in DIMACS:
-23672  23673 -23674 -626 -23675 0
-23672  23673 -23674 -626 -23676 0
-23672  23673 -23674 -626 -23677 0

c  0+1 --> 1
c    (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧  p_626) -> (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0)
c  in CNF:
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_2
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_1
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨  b^{313, 3}_0
c  in DIMACS:
 23672  23673  23674 -626 -23675 0
 23672  23673  23674 -626 -23676 0
 23672  23673  23674 -626  23677 0

c  1+1 --> 2
c    (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0 ∧  p_626) -> (-b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0)
c  in CNF:
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_2
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨  b^{313, 3}_1
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ -p_626 ∨ -b^{313, 3}_0
c  in DIMACS:
 23672  23673 -23674 -626 -23675 0
 23672  23673 -23674 -626  23676 0
 23672  23673 -23674 -626 -23677 0

c  2+1 --> break 
c    (-b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧  p_626) -> break
c  in CNF:
c     b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ -p_626 ∨ break
c  in DIMACS:
 23672 -23673  23674 -626 1162 0


c  2-1 --> 1
c    (-b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧ -p_626) -> (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0)
c  in CNF:
c     b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_2
c     b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_1
c     b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨  b^{313, 3}_0
c  in DIMACS:
 23672 -23673  23674  626 -23675 0
 23672 -23673  23674  626 -23676 0
 23672 -23673  23674  626  23677 0

c  1-1 --> 0
c    (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0 ∧ -p_626) -> (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧ -b^{313, 3}_0)
c  in CNF:
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_2
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_1
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_0
c  in DIMACS:
 23672  23673 -23674  626 -23675 0
 23672  23673 -23674  626 -23676 0
 23672  23673 -23674  626 -23677 0

c  0-1 --> -1
c    (-b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧ -p_626) -> ( b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0)
c  in CNF:
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨  b^{313, 3}_2
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_1
c     b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨  b^{313, 3}_0
c  in DIMACS:
 23672  23673  23674  626  23675 0
 23672  23673  23674  626 -23676 0
 23672  23673  23674  626  23677 0

c  -1-1 --> -2
c    ( b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧  b^{313, 2}_0 ∧ -p_626) -> ( b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0)
c  in CNF:
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨  b^{313, 3}_2
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨  b^{313, 3}_1
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨  p_626 ∨ -b^{313, 3}_0
c  in DIMACS:
-23672  23673 -23674  626  23675 0
-23672  23673 -23674  626  23676 0
-23672  23673 -23674  626 -23677 0

c  -2-1 --> break 
c    ( b^{313, 2}_2 ∧  b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧ -p_626) -> break
c  in CNF:
c    -b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨  b^{313, 2}_0 ∨  p_626 ∨ break
c  in DIMACS:
-23672 -23673  23674  626 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{313, 2}_2 ∧ -b^{313, 2}_1 ∧ -b^{313, 2}_0 ∧ true) 
c  in CNF:
c    -b^{313, 2}_2 ∨  b^{313, 2}_1 ∨  b^{313, 2}_0 ∨ false 
c  in DIMACS:
-23672  23673  23674  0

c  3 does not represent an automaton state.
c    -(-b^{313, 2}_2 ∧  b^{313, 2}_1 ∧  b^{313, 2}_0 ∧ true) 
c  in CNF:
c     b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ false 
c  in DIMACS:
 23672 -23673 -23674  0
c  -3 does not represent an automaton state.
c    -( b^{313, 2}_2 ∧  b^{313, 2}_1 ∧  b^{313, 2}_0 ∧ true) 
c  in CNF:
c    -b^{313, 2}_2 ∨ -b^{313, 2}_1 ∨ -b^{313, 2}_0 ∨ false 
c  in DIMACS:
-23672 -23673 -23674  0

c i = 3
c  -2+1 --> -1
c    ( b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧  p_939) -> ( b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧  b^{313, 4}_0)
c  in CNF:
c    -b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨  b^{313, 4}_2
c    -b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_1
c    -b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨  b^{313, 4}_0
c  in DIMACS:
-23675 -23676  23677 -939  23678 0
-23675 -23676  23677 -939 -23679 0
-23675 -23676  23677 -939  23680 0

c  -1+1 --> 0
c    ( b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0 ∧  p_939) -> (-b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧ -b^{313, 4}_0)
c  in CNF:
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_2
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_1
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_0
c  in DIMACS:
-23675  23676 -23677 -939 -23678 0
-23675  23676 -23677 -939 -23679 0
-23675  23676 -23677 -939 -23680 0

c  0+1 --> 1
c    (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧  p_939) -> (-b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧  b^{313, 4}_0)
c  in CNF:
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_2
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_1
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨  b^{313, 4}_0
c  in DIMACS:
 23675  23676  23677 -939 -23678 0
 23675  23676  23677 -939 -23679 0
 23675  23676  23677 -939  23680 0

c  1+1 --> 2
c    (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0 ∧  p_939) -> (-b^{313, 4}_2 ∧  b^{313, 4}_1 ∧ -b^{313, 4}_0)
c  in CNF:
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_2
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨  b^{313, 4}_1
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ -p_939 ∨ -b^{313, 4}_0
c  in DIMACS:
 23675  23676 -23677 -939 -23678 0
 23675  23676 -23677 -939  23679 0
 23675  23676 -23677 -939 -23680 0

c  2+1 --> break 
c    (-b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧  p_939) -> break
c  in CNF:
c     b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ -p_939 ∨ break
c  in DIMACS:
 23675 -23676  23677 -939 1162 0


c  2-1 --> 1
c    (-b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧ -p_939) -> (-b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧  b^{313, 4}_0)
c  in CNF:
c     b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_2
c     b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_1
c     b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨  b^{313, 4}_0
c  in DIMACS:
 23675 -23676  23677  939 -23678 0
 23675 -23676  23677  939 -23679 0
 23675 -23676  23677  939  23680 0

c  1-1 --> 0
c    (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0 ∧ -p_939) -> (-b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧ -b^{313, 4}_0)
c  in CNF:
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_2
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_1
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_0
c  in DIMACS:
 23675  23676 -23677  939 -23678 0
 23675  23676 -23677  939 -23679 0
 23675  23676 -23677  939 -23680 0

c  0-1 --> -1
c    (-b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧ -p_939) -> ( b^{313, 4}_2 ∧ -b^{313, 4}_1 ∧  b^{313, 4}_0)
c  in CNF:
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨  b^{313, 4}_2
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_1
c     b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨  b^{313, 4}_0
c  in DIMACS:
 23675  23676  23677  939  23678 0
 23675  23676  23677  939 -23679 0
 23675  23676  23677  939  23680 0

c  -1-1 --> -2
c    ( b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧  b^{313, 3}_0 ∧ -p_939) -> ( b^{313, 4}_2 ∧  b^{313, 4}_1 ∧ -b^{313, 4}_0)
c  in CNF:
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨  b^{313, 4}_2
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨  b^{313, 4}_1
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨  p_939 ∨ -b^{313, 4}_0
c  in DIMACS:
-23675  23676 -23677  939  23678 0
-23675  23676 -23677  939  23679 0
-23675  23676 -23677  939 -23680 0

c  -2-1 --> break 
c    ( b^{313, 3}_2 ∧  b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧ -p_939) -> break
c  in CNF:
c    -b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨  b^{313, 3}_0 ∨  p_939 ∨ break
c  in DIMACS:
-23675 -23676  23677  939 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{313, 3}_2 ∧ -b^{313, 3}_1 ∧ -b^{313, 3}_0 ∧ true) 
c  in CNF:
c    -b^{313, 3}_2 ∨  b^{313, 3}_1 ∨  b^{313, 3}_0 ∨ false 
c  in DIMACS:
-23675  23676  23677  0

c  3 does not represent an automaton state.
c    -(-b^{313, 3}_2 ∧  b^{313, 3}_1 ∧  b^{313, 3}_0 ∧ true) 
c  in CNF:
c     b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ false 
c  in DIMACS:
 23675 -23676 -23677  0
c  -3 does not represent an automaton state.
c    -( b^{313, 3}_2 ∧  b^{313, 3}_1 ∧  b^{313, 3}_0 ∧ true) 
c  in CNF:
c    -b^{313, 3}_2 ∨ -b^{313, 3}_1 ∨ -b^{313, 3}_0 ∨ false 
c  in DIMACS:
-23675 -23676 -23677  0

c INIT for k = 314
c    -b^{314, 1}_2
c    -b^{314, 1}_1
c    -b^{314, 1}_0
c  in DIMACS:
-23681 0
-23682 0
-23683 0

c Transitions for k = 314
c i = 1
c  -2+1 --> -1
c    ( b^{314, 1}_2 ∧  b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧  p_314) -> ( b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0)
c  in CNF:
c    -b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨  b^{314, 2}_2
c    -b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_1
c    -b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨  b^{314, 2}_0
c  in DIMACS:
-23681 -23682  23683 -314  23684 0
-23681 -23682  23683 -314 -23685 0
-23681 -23682  23683 -314  23686 0

c  -1+1 --> 0
c    ( b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧  b^{314, 1}_0 ∧  p_314) -> (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧ -b^{314, 2}_0)
c  in CNF:
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_2
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_1
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_0
c  in DIMACS:
-23681  23682 -23683 -314 -23684 0
-23681  23682 -23683 -314 -23685 0
-23681  23682 -23683 -314 -23686 0

c  0+1 --> 1
c    (-b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧  p_314) -> (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0)
c  in CNF:
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_2
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_1
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨  b^{314, 2}_0
c  in DIMACS:
 23681  23682  23683 -314 -23684 0
 23681  23682  23683 -314 -23685 0
 23681  23682  23683 -314  23686 0

c  1+1 --> 2
c    (-b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧  b^{314, 1}_0 ∧  p_314) -> (-b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0)
c  in CNF:
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_2
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨  b^{314, 2}_1
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ -p_314 ∨ -b^{314, 2}_0
c  in DIMACS:
 23681  23682 -23683 -314 -23684 0
 23681  23682 -23683 -314  23685 0
 23681  23682 -23683 -314 -23686 0

c  2+1 --> break 
c    (-b^{314, 1}_2 ∧  b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧  p_314) -> break
c  in CNF:
c     b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ -p_314 ∨ break
c  in DIMACS:
 23681 -23682  23683 -314 1162 0


c  2-1 --> 1
c    (-b^{314, 1}_2 ∧  b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧ -p_314) -> (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0)
c  in CNF:
c     b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_2
c     b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_1
c     b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨  b^{314, 2}_0
c  in DIMACS:
 23681 -23682  23683  314 -23684 0
 23681 -23682  23683  314 -23685 0
 23681 -23682  23683  314  23686 0

c  1-1 --> 0
c    (-b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧  b^{314, 1}_0 ∧ -p_314) -> (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧ -b^{314, 2}_0)
c  in CNF:
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_2
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_1
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_0
c  in DIMACS:
 23681  23682 -23683  314 -23684 0
 23681  23682 -23683  314 -23685 0
 23681  23682 -23683  314 -23686 0

c  0-1 --> -1
c    (-b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧ -p_314) -> ( b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0)
c  in CNF:
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨  b^{314, 2}_2
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_1
c     b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨  b^{314, 2}_0
c  in DIMACS:
 23681  23682  23683  314  23684 0
 23681  23682  23683  314 -23685 0
 23681  23682  23683  314  23686 0

c  -1-1 --> -2
c    ( b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧  b^{314, 1}_0 ∧ -p_314) -> ( b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0)
c  in CNF:
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨  b^{314, 2}_2
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨  b^{314, 2}_1
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨  p_314 ∨ -b^{314, 2}_0
c  in DIMACS:
-23681  23682 -23683  314  23684 0
-23681  23682 -23683  314  23685 0
-23681  23682 -23683  314 -23686 0

c  -2-1 --> break 
c    ( b^{314, 1}_2 ∧  b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧ -p_314) -> break
c  in CNF:
c    -b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨  b^{314, 1}_0 ∨  p_314 ∨ break
c  in DIMACS:
-23681 -23682  23683  314 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{314, 1}_2 ∧ -b^{314, 1}_1 ∧ -b^{314, 1}_0 ∧ true) 
c  in CNF:
c    -b^{314, 1}_2 ∨  b^{314, 1}_1 ∨  b^{314, 1}_0 ∨ false 
c  in DIMACS:
-23681  23682  23683  0

c  3 does not represent an automaton state.
c    -(-b^{314, 1}_2 ∧  b^{314, 1}_1 ∧  b^{314, 1}_0 ∧ true) 
c  in CNF:
c     b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ false 
c  in DIMACS:
 23681 -23682 -23683  0
c  -3 does not represent an automaton state.
c    -( b^{314, 1}_2 ∧  b^{314, 1}_1 ∧  b^{314, 1}_0 ∧ true) 
c  in CNF:
c    -b^{314, 1}_2 ∨ -b^{314, 1}_1 ∨ -b^{314, 1}_0 ∨ false 
c  in DIMACS:
-23681 -23682 -23683  0

c i = 2
c  -2+1 --> -1
c    ( b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧  p_628) -> ( b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0)
c  in CNF:
c    -b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨  b^{314, 3}_2
c    -b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_1
c    -b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨  b^{314, 3}_0
c  in DIMACS:
-23684 -23685  23686 -628  23687 0
-23684 -23685  23686 -628 -23688 0
-23684 -23685  23686 -628  23689 0

c  -1+1 --> 0
c    ( b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0 ∧  p_628) -> (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧ -b^{314, 3}_0)
c  in CNF:
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_2
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_1
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_0
c  in DIMACS:
-23684  23685 -23686 -628 -23687 0
-23684  23685 -23686 -628 -23688 0
-23684  23685 -23686 -628 -23689 0

c  0+1 --> 1
c    (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧  p_628) -> (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0)
c  in CNF:
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_2
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_1
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨  b^{314, 3}_0
c  in DIMACS:
 23684  23685  23686 -628 -23687 0
 23684  23685  23686 -628 -23688 0
 23684  23685  23686 -628  23689 0

c  1+1 --> 2
c    (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0 ∧  p_628) -> (-b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0)
c  in CNF:
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_2
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨  b^{314, 3}_1
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ -p_628 ∨ -b^{314, 3}_0
c  in DIMACS:
 23684  23685 -23686 -628 -23687 0
 23684  23685 -23686 -628  23688 0
 23684  23685 -23686 -628 -23689 0

c  2+1 --> break 
c    (-b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧  p_628) -> break
c  in CNF:
c     b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ -p_628 ∨ break
c  in DIMACS:
 23684 -23685  23686 -628 1162 0


c  2-1 --> 1
c    (-b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧ -p_628) -> (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0)
c  in CNF:
c     b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_2
c     b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_1
c     b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨  b^{314, 3}_0
c  in DIMACS:
 23684 -23685  23686  628 -23687 0
 23684 -23685  23686  628 -23688 0
 23684 -23685  23686  628  23689 0

c  1-1 --> 0
c    (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0 ∧ -p_628) -> (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧ -b^{314, 3}_0)
c  in CNF:
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_2
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_1
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_0
c  in DIMACS:
 23684  23685 -23686  628 -23687 0
 23684  23685 -23686  628 -23688 0
 23684  23685 -23686  628 -23689 0

c  0-1 --> -1
c    (-b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧ -p_628) -> ( b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0)
c  in CNF:
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨  b^{314, 3}_2
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_1
c     b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨  b^{314, 3}_0
c  in DIMACS:
 23684  23685  23686  628  23687 0
 23684  23685  23686  628 -23688 0
 23684  23685  23686  628  23689 0

c  -1-1 --> -2
c    ( b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧  b^{314, 2}_0 ∧ -p_628) -> ( b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0)
c  in CNF:
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨  b^{314, 3}_2
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨  b^{314, 3}_1
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨  p_628 ∨ -b^{314, 3}_0
c  in DIMACS:
-23684  23685 -23686  628  23687 0
-23684  23685 -23686  628  23688 0
-23684  23685 -23686  628 -23689 0

c  -2-1 --> break 
c    ( b^{314, 2}_2 ∧  b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧ -p_628) -> break
c  in CNF:
c    -b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨  b^{314, 2}_0 ∨  p_628 ∨ break
c  in DIMACS:
-23684 -23685  23686  628 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{314, 2}_2 ∧ -b^{314, 2}_1 ∧ -b^{314, 2}_0 ∧ true) 
c  in CNF:
c    -b^{314, 2}_2 ∨  b^{314, 2}_1 ∨  b^{314, 2}_0 ∨ false 
c  in DIMACS:
-23684  23685  23686  0

c  3 does not represent an automaton state.
c    -(-b^{314, 2}_2 ∧  b^{314, 2}_1 ∧  b^{314, 2}_0 ∧ true) 
c  in CNF:
c     b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ false 
c  in DIMACS:
 23684 -23685 -23686  0
c  -3 does not represent an automaton state.
c    -( b^{314, 2}_2 ∧  b^{314, 2}_1 ∧  b^{314, 2}_0 ∧ true) 
c  in CNF:
c    -b^{314, 2}_2 ∨ -b^{314, 2}_1 ∨ -b^{314, 2}_0 ∨ false 
c  in DIMACS:
-23684 -23685 -23686  0

c i = 3
c  -2+1 --> -1
c    ( b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧  p_942) -> ( b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧  b^{314, 4}_0)
c  in CNF:
c    -b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨  b^{314, 4}_2
c    -b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_1
c    -b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨  b^{314, 4}_0
c  in DIMACS:
-23687 -23688  23689 -942  23690 0
-23687 -23688  23689 -942 -23691 0
-23687 -23688  23689 -942  23692 0

c  -1+1 --> 0
c    ( b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0 ∧  p_942) -> (-b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧ -b^{314, 4}_0)
c  in CNF:
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_2
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_1
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_0
c  in DIMACS:
-23687  23688 -23689 -942 -23690 0
-23687  23688 -23689 -942 -23691 0
-23687  23688 -23689 -942 -23692 0

c  0+1 --> 1
c    (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧  p_942) -> (-b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧  b^{314, 4}_0)
c  in CNF:
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_2
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_1
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨  b^{314, 4}_0
c  in DIMACS:
 23687  23688  23689 -942 -23690 0
 23687  23688  23689 -942 -23691 0
 23687  23688  23689 -942  23692 0

c  1+1 --> 2
c    (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0 ∧  p_942) -> (-b^{314, 4}_2 ∧  b^{314, 4}_1 ∧ -b^{314, 4}_0)
c  in CNF:
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_2
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨  b^{314, 4}_1
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ -p_942 ∨ -b^{314, 4}_0
c  in DIMACS:
 23687  23688 -23689 -942 -23690 0
 23687  23688 -23689 -942  23691 0
 23687  23688 -23689 -942 -23692 0

c  2+1 --> break 
c    (-b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧  p_942) -> break
c  in CNF:
c     b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ -p_942 ∨ break
c  in DIMACS:
 23687 -23688  23689 -942 1162 0


c  2-1 --> 1
c    (-b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧ -p_942) -> (-b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧  b^{314, 4}_0)
c  in CNF:
c     b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_2
c     b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_1
c     b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨  b^{314, 4}_0
c  in DIMACS:
 23687 -23688  23689  942 -23690 0
 23687 -23688  23689  942 -23691 0
 23687 -23688  23689  942  23692 0

c  1-1 --> 0
c    (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0 ∧ -p_942) -> (-b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧ -b^{314, 4}_0)
c  in CNF:
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_2
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_1
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_0
c  in DIMACS:
 23687  23688 -23689  942 -23690 0
 23687  23688 -23689  942 -23691 0
 23687  23688 -23689  942 -23692 0

c  0-1 --> -1
c    (-b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧ -p_942) -> ( b^{314, 4}_2 ∧ -b^{314, 4}_1 ∧  b^{314, 4}_0)
c  in CNF:
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨  b^{314, 4}_2
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_1
c     b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨  b^{314, 4}_0
c  in DIMACS:
 23687  23688  23689  942  23690 0
 23687  23688  23689  942 -23691 0
 23687  23688  23689  942  23692 0

c  -1-1 --> -2
c    ( b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧  b^{314, 3}_0 ∧ -p_942) -> ( b^{314, 4}_2 ∧  b^{314, 4}_1 ∧ -b^{314, 4}_0)
c  in CNF:
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨  b^{314, 4}_2
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨  b^{314, 4}_1
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨  p_942 ∨ -b^{314, 4}_0
c  in DIMACS:
-23687  23688 -23689  942  23690 0
-23687  23688 -23689  942  23691 0
-23687  23688 -23689  942 -23692 0

c  -2-1 --> break 
c    ( b^{314, 3}_2 ∧  b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧ -p_942) -> break
c  in CNF:
c    -b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨  b^{314, 3}_0 ∨  p_942 ∨ break
c  in DIMACS:
-23687 -23688  23689  942 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{314, 3}_2 ∧ -b^{314, 3}_1 ∧ -b^{314, 3}_0 ∧ true) 
c  in CNF:
c    -b^{314, 3}_2 ∨  b^{314, 3}_1 ∨  b^{314, 3}_0 ∨ false 
c  in DIMACS:
-23687  23688  23689  0

c  3 does not represent an automaton state.
c    -(-b^{314, 3}_2 ∧  b^{314, 3}_1 ∧  b^{314, 3}_0 ∧ true) 
c  in CNF:
c     b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ false 
c  in DIMACS:
 23687 -23688 -23689  0
c  -3 does not represent an automaton state.
c    -( b^{314, 3}_2 ∧  b^{314, 3}_1 ∧  b^{314, 3}_0 ∧ true) 
c  in CNF:
c    -b^{314, 3}_2 ∨ -b^{314, 3}_1 ∨ -b^{314, 3}_0 ∨ false 
c  in DIMACS:
-23687 -23688 -23689  0

c INIT for k = 315
c    -b^{315, 1}_2
c    -b^{315, 1}_1
c    -b^{315, 1}_0
c  in DIMACS:
-23693 0
-23694 0
-23695 0

c Transitions for k = 315
c i = 1
c  -2+1 --> -1
c    ( b^{315, 1}_2 ∧  b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧  p_315) -> ( b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0)
c  in CNF:
c    -b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨  b^{315, 2}_2
c    -b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_1
c    -b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨  b^{315, 2}_0
c  in DIMACS:
-23693 -23694  23695 -315  23696 0
-23693 -23694  23695 -315 -23697 0
-23693 -23694  23695 -315  23698 0

c  -1+1 --> 0
c    ( b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧  b^{315, 1}_0 ∧  p_315) -> (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧ -b^{315, 2}_0)
c  in CNF:
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_2
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_1
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_0
c  in DIMACS:
-23693  23694 -23695 -315 -23696 0
-23693  23694 -23695 -315 -23697 0
-23693  23694 -23695 -315 -23698 0

c  0+1 --> 1
c    (-b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧  p_315) -> (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0)
c  in CNF:
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_2
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_1
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨  b^{315, 2}_0
c  in DIMACS:
 23693  23694  23695 -315 -23696 0
 23693  23694  23695 -315 -23697 0
 23693  23694  23695 -315  23698 0

c  1+1 --> 2
c    (-b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧  b^{315, 1}_0 ∧  p_315) -> (-b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0)
c  in CNF:
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_2
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨  b^{315, 2}_1
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ -p_315 ∨ -b^{315, 2}_0
c  in DIMACS:
 23693  23694 -23695 -315 -23696 0
 23693  23694 -23695 -315  23697 0
 23693  23694 -23695 -315 -23698 0

c  2+1 --> break 
c    (-b^{315, 1}_2 ∧  b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧  p_315) -> break
c  in CNF:
c     b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ -p_315 ∨ break
c  in DIMACS:
 23693 -23694  23695 -315 1162 0


c  2-1 --> 1
c    (-b^{315, 1}_2 ∧  b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧ -p_315) -> (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0)
c  in CNF:
c     b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_2
c     b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_1
c     b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨  b^{315, 2}_0
c  in DIMACS:
 23693 -23694  23695  315 -23696 0
 23693 -23694  23695  315 -23697 0
 23693 -23694  23695  315  23698 0

c  1-1 --> 0
c    (-b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧  b^{315, 1}_0 ∧ -p_315) -> (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧ -b^{315, 2}_0)
c  in CNF:
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_2
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_1
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_0
c  in DIMACS:
 23693  23694 -23695  315 -23696 0
 23693  23694 -23695  315 -23697 0
 23693  23694 -23695  315 -23698 0

c  0-1 --> -1
c    (-b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧ -p_315) -> ( b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0)
c  in CNF:
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨  b^{315, 2}_2
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_1
c     b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨  b^{315, 2}_0
c  in DIMACS:
 23693  23694  23695  315  23696 0
 23693  23694  23695  315 -23697 0
 23693  23694  23695  315  23698 0

c  -1-1 --> -2
c    ( b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧  b^{315, 1}_0 ∧ -p_315) -> ( b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0)
c  in CNF:
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨  b^{315, 2}_2
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨  b^{315, 2}_1
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨  p_315 ∨ -b^{315, 2}_0
c  in DIMACS:
-23693  23694 -23695  315  23696 0
-23693  23694 -23695  315  23697 0
-23693  23694 -23695  315 -23698 0

c  -2-1 --> break 
c    ( b^{315, 1}_2 ∧  b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧ -p_315) -> break
c  in CNF:
c    -b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨  b^{315, 1}_0 ∨  p_315 ∨ break
c  in DIMACS:
-23693 -23694  23695  315 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{315, 1}_2 ∧ -b^{315, 1}_1 ∧ -b^{315, 1}_0 ∧ true) 
c  in CNF:
c    -b^{315, 1}_2 ∨  b^{315, 1}_1 ∨  b^{315, 1}_0 ∨ false 
c  in DIMACS:
-23693  23694  23695  0

c  3 does not represent an automaton state.
c    -(-b^{315, 1}_2 ∧  b^{315, 1}_1 ∧  b^{315, 1}_0 ∧ true) 
c  in CNF:
c     b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ false 
c  in DIMACS:
 23693 -23694 -23695  0
c  -3 does not represent an automaton state.
c    -( b^{315, 1}_2 ∧  b^{315, 1}_1 ∧  b^{315, 1}_0 ∧ true) 
c  in CNF:
c    -b^{315, 1}_2 ∨ -b^{315, 1}_1 ∨ -b^{315, 1}_0 ∨ false 
c  in DIMACS:
-23693 -23694 -23695  0

c i = 2
c  -2+1 --> -1
c    ( b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧  p_630) -> ( b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0)
c  in CNF:
c    -b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨  b^{315, 3}_2
c    -b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_1
c    -b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨  b^{315, 3}_0
c  in DIMACS:
-23696 -23697  23698 -630  23699 0
-23696 -23697  23698 -630 -23700 0
-23696 -23697  23698 -630  23701 0

c  -1+1 --> 0
c    ( b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0 ∧  p_630) -> (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧ -b^{315, 3}_0)
c  in CNF:
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_2
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_1
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_0
c  in DIMACS:
-23696  23697 -23698 -630 -23699 0
-23696  23697 -23698 -630 -23700 0
-23696  23697 -23698 -630 -23701 0

c  0+1 --> 1
c    (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧  p_630) -> (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0)
c  in CNF:
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_2
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_1
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨  b^{315, 3}_0
c  in DIMACS:
 23696  23697  23698 -630 -23699 0
 23696  23697  23698 -630 -23700 0
 23696  23697  23698 -630  23701 0

c  1+1 --> 2
c    (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0 ∧  p_630) -> (-b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0)
c  in CNF:
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_2
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨  b^{315, 3}_1
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ -p_630 ∨ -b^{315, 3}_0
c  in DIMACS:
 23696  23697 -23698 -630 -23699 0
 23696  23697 -23698 -630  23700 0
 23696  23697 -23698 -630 -23701 0

c  2+1 --> break 
c    (-b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧  p_630) -> break
c  in CNF:
c     b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ -p_630 ∨ break
c  in DIMACS:
 23696 -23697  23698 -630 1162 0


c  2-1 --> 1
c    (-b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧ -p_630) -> (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0)
c  in CNF:
c     b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_2
c     b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_1
c     b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨  b^{315, 3}_0
c  in DIMACS:
 23696 -23697  23698  630 -23699 0
 23696 -23697  23698  630 -23700 0
 23696 -23697  23698  630  23701 0

c  1-1 --> 0
c    (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0 ∧ -p_630) -> (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧ -b^{315, 3}_0)
c  in CNF:
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_2
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_1
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_0
c  in DIMACS:
 23696  23697 -23698  630 -23699 0
 23696  23697 -23698  630 -23700 0
 23696  23697 -23698  630 -23701 0

c  0-1 --> -1
c    (-b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧ -p_630) -> ( b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0)
c  in CNF:
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨  b^{315, 3}_2
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_1
c     b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨  b^{315, 3}_0
c  in DIMACS:
 23696  23697  23698  630  23699 0
 23696  23697  23698  630 -23700 0
 23696  23697  23698  630  23701 0

c  -1-1 --> -2
c    ( b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧  b^{315, 2}_0 ∧ -p_630) -> ( b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0)
c  in CNF:
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨  b^{315, 3}_2
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨  b^{315, 3}_1
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨  p_630 ∨ -b^{315, 3}_0
c  in DIMACS:
-23696  23697 -23698  630  23699 0
-23696  23697 -23698  630  23700 0
-23696  23697 -23698  630 -23701 0

c  -2-1 --> break 
c    ( b^{315, 2}_2 ∧  b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧ -p_630) -> break
c  in CNF:
c    -b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨  b^{315, 2}_0 ∨  p_630 ∨ break
c  in DIMACS:
-23696 -23697  23698  630 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{315, 2}_2 ∧ -b^{315, 2}_1 ∧ -b^{315, 2}_0 ∧ true) 
c  in CNF:
c    -b^{315, 2}_2 ∨  b^{315, 2}_1 ∨  b^{315, 2}_0 ∨ false 
c  in DIMACS:
-23696  23697  23698  0

c  3 does not represent an automaton state.
c    -(-b^{315, 2}_2 ∧  b^{315, 2}_1 ∧  b^{315, 2}_0 ∧ true) 
c  in CNF:
c     b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ false 
c  in DIMACS:
 23696 -23697 -23698  0
c  -3 does not represent an automaton state.
c    -( b^{315, 2}_2 ∧  b^{315, 2}_1 ∧  b^{315, 2}_0 ∧ true) 
c  in CNF:
c    -b^{315, 2}_2 ∨ -b^{315, 2}_1 ∨ -b^{315, 2}_0 ∨ false 
c  in DIMACS:
-23696 -23697 -23698  0

c i = 3
c  -2+1 --> -1
c    ( b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧  p_945) -> ( b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧  b^{315, 4}_0)
c  in CNF:
c    -b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨  b^{315, 4}_2
c    -b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_1
c    -b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨  b^{315, 4}_0
c  in DIMACS:
-23699 -23700  23701 -945  23702 0
-23699 -23700  23701 -945 -23703 0
-23699 -23700  23701 -945  23704 0

c  -1+1 --> 0
c    ( b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0 ∧  p_945) -> (-b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧ -b^{315, 4}_0)
c  in CNF:
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_2
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_1
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_0
c  in DIMACS:
-23699  23700 -23701 -945 -23702 0
-23699  23700 -23701 -945 -23703 0
-23699  23700 -23701 -945 -23704 0

c  0+1 --> 1
c    (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧  p_945) -> (-b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧  b^{315, 4}_0)
c  in CNF:
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_2
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_1
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨  b^{315, 4}_0
c  in DIMACS:
 23699  23700  23701 -945 -23702 0
 23699  23700  23701 -945 -23703 0
 23699  23700  23701 -945  23704 0

c  1+1 --> 2
c    (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0 ∧  p_945) -> (-b^{315, 4}_2 ∧  b^{315, 4}_1 ∧ -b^{315, 4}_0)
c  in CNF:
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_2
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨  b^{315, 4}_1
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ -p_945 ∨ -b^{315, 4}_0
c  in DIMACS:
 23699  23700 -23701 -945 -23702 0
 23699  23700 -23701 -945  23703 0
 23699  23700 -23701 -945 -23704 0

c  2+1 --> break 
c    (-b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧  p_945) -> break
c  in CNF:
c     b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ -p_945 ∨ break
c  in DIMACS:
 23699 -23700  23701 -945 1162 0


c  2-1 --> 1
c    (-b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧ -p_945) -> (-b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧  b^{315, 4}_0)
c  in CNF:
c     b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_2
c     b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_1
c     b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨  b^{315, 4}_0
c  in DIMACS:
 23699 -23700  23701  945 -23702 0
 23699 -23700  23701  945 -23703 0
 23699 -23700  23701  945  23704 0

c  1-1 --> 0
c    (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0 ∧ -p_945) -> (-b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧ -b^{315, 4}_0)
c  in CNF:
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_2
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_1
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_0
c  in DIMACS:
 23699  23700 -23701  945 -23702 0
 23699  23700 -23701  945 -23703 0
 23699  23700 -23701  945 -23704 0

c  0-1 --> -1
c    (-b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧ -p_945) -> ( b^{315, 4}_2 ∧ -b^{315, 4}_1 ∧  b^{315, 4}_0)
c  in CNF:
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨  b^{315, 4}_2
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_1
c     b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨  b^{315, 4}_0
c  in DIMACS:
 23699  23700  23701  945  23702 0
 23699  23700  23701  945 -23703 0
 23699  23700  23701  945  23704 0

c  -1-1 --> -2
c    ( b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧  b^{315, 3}_0 ∧ -p_945) -> ( b^{315, 4}_2 ∧  b^{315, 4}_1 ∧ -b^{315, 4}_0)
c  in CNF:
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨  b^{315, 4}_2
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨  b^{315, 4}_1
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨  p_945 ∨ -b^{315, 4}_0
c  in DIMACS:
-23699  23700 -23701  945  23702 0
-23699  23700 -23701  945  23703 0
-23699  23700 -23701  945 -23704 0

c  -2-1 --> break 
c    ( b^{315, 3}_2 ∧  b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧ -p_945) -> break
c  in CNF:
c    -b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨  b^{315, 3}_0 ∨  p_945 ∨ break
c  in DIMACS:
-23699 -23700  23701  945 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{315, 3}_2 ∧ -b^{315, 3}_1 ∧ -b^{315, 3}_0 ∧ true) 
c  in CNF:
c    -b^{315, 3}_2 ∨  b^{315, 3}_1 ∨  b^{315, 3}_0 ∨ false 
c  in DIMACS:
-23699  23700  23701  0

c  3 does not represent an automaton state.
c    -(-b^{315, 3}_2 ∧  b^{315, 3}_1 ∧  b^{315, 3}_0 ∧ true) 
c  in CNF:
c     b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ false 
c  in DIMACS:
 23699 -23700 -23701  0
c  -3 does not represent an automaton state.
c    -( b^{315, 3}_2 ∧  b^{315, 3}_1 ∧  b^{315, 3}_0 ∧ true) 
c  in CNF:
c    -b^{315, 3}_2 ∨ -b^{315, 3}_1 ∨ -b^{315, 3}_0 ∨ false 
c  in DIMACS:
-23699 -23700 -23701  0

c INIT for k = 316
c    -b^{316, 1}_2
c    -b^{316, 1}_1
c    -b^{316, 1}_0
c  in DIMACS:
-23705 0
-23706 0
-23707 0

c Transitions for k = 316
c i = 1
c  -2+1 --> -1
c    ( b^{316, 1}_2 ∧  b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧  p_316) -> ( b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0)
c  in CNF:
c    -b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨  b^{316, 2}_2
c    -b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_1
c    -b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨  b^{316, 2}_0
c  in DIMACS:
-23705 -23706  23707 -316  23708 0
-23705 -23706  23707 -316 -23709 0
-23705 -23706  23707 -316  23710 0

c  -1+1 --> 0
c    ( b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧  b^{316, 1}_0 ∧  p_316) -> (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧ -b^{316, 2}_0)
c  in CNF:
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_2
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_1
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_0
c  in DIMACS:
-23705  23706 -23707 -316 -23708 0
-23705  23706 -23707 -316 -23709 0
-23705  23706 -23707 -316 -23710 0

c  0+1 --> 1
c    (-b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧  p_316) -> (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0)
c  in CNF:
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_2
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_1
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨  b^{316, 2}_0
c  in DIMACS:
 23705  23706  23707 -316 -23708 0
 23705  23706  23707 -316 -23709 0
 23705  23706  23707 -316  23710 0

c  1+1 --> 2
c    (-b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧  b^{316, 1}_0 ∧  p_316) -> (-b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0)
c  in CNF:
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_2
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨  b^{316, 2}_1
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ -p_316 ∨ -b^{316, 2}_0
c  in DIMACS:
 23705  23706 -23707 -316 -23708 0
 23705  23706 -23707 -316  23709 0
 23705  23706 -23707 -316 -23710 0

c  2+1 --> break 
c    (-b^{316, 1}_2 ∧  b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧  p_316) -> break
c  in CNF:
c     b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ -p_316 ∨ break
c  in DIMACS:
 23705 -23706  23707 -316 1162 0


c  2-1 --> 1
c    (-b^{316, 1}_2 ∧  b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧ -p_316) -> (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0)
c  in CNF:
c     b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_2
c     b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_1
c     b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨  b^{316, 2}_0
c  in DIMACS:
 23705 -23706  23707  316 -23708 0
 23705 -23706  23707  316 -23709 0
 23705 -23706  23707  316  23710 0

c  1-1 --> 0
c    (-b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧  b^{316, 1}_0 ∧ -p_316) -> (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧ -b^{316, 2}_0)
c  in CNF:
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_2
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_1
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_0
c  in DIMACS:
 23705  23706 -23707  316 -23708 0
 23705  23706 -23707  316 -23709 0
 23705  23706 -23707  316 -23710 0

c  0-1 --> -1
c    (-b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧ -p_316) -> ( b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0)
c  in CNF:
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨  b^{316, 2}_2
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_1
c     b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨  b^{316, 2}_0
c  in DIMACS:
 23705  23706  23707  316  23708 0
 23705  23706  23707  316 -23709 0
 23705  23706  23707  316  23710 0

c  -1-1 --> -2
c    ( b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧  b^{316, 1}_0 ∧ -p_316) -> ( b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0)
c  in CNF:
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨  b^{316, 2}_2
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨  b^{316, 2}_1
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨  p_316 ∨ -b^{316, 2}_0
c  in DIMACS:
-23705  23706 -23707  316  23708 0
-23705  23706 -23707  316  23709 0
-23705  23706 -23707  316 -23710 0

c  -2-1 --> break 
c    ( b^{316, 1}_2 ∧  b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧ -p_316) -> break
c  in CNF:
c    -b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨  b^{316, 1}_0 ∨  p_316 ∨ break
c  in DIMACS:
-23705 -23706  23707  316 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{316, 1}_2 ∧ -b^{316, 1}_1 ∧ -b^{316, 1}_0 ∧ true) 
c  in CNF:
c    -b^{316, 1}_2 ∨  b^{316, 1}_1 ∨  b^{316, 1}_0 ∨ false 
c  in DIMACS:
-23705  23706  23707  0

c  3 does not represent an automaton state.
c    -(-b^{316, 1}_2 ∧  b^{316, 1}_1 ∧  b^{316, 1}_0 ∧ true) 
c  in CNF:
c     b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ false 
c  in DIMACS:
 23705 -23706 -23707  0
c  -3 does not represent an automaton state.
c    -( b^{316, 1}_2 ∧  b^{316, 1}_1 ∧  b^{316, 1}_0 ∧ true) 
c  in CNF:
c    -b^{316, 1}_2 ∨ -b^{316, 1}_1 ∨ -b^{316, 1}_0 ∨ false 
c  in DIMACS:
-23705 -23706 -23707  0

c i = 2
c  -2+1 --> -1
c    ( b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧  p_632) -> ( b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0)
c  in CNF:
c    -b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨  b^{316, 3}_2
c    -b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_1
c    -b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨  b^{316, 3}_0
c  in DIMACS:
-23708 -23709  23710 -632  23711 0
-23708 -23709  23710 -632 -23712 0
-23708 -23709  23710 -632  23713 0

c  -1+1 --> 0
c    ( b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0 ∧  p_632) -> (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧ -b^{316, 3}_0)
c  in CNF:
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_2
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_1
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_0
c  in DIMACS:
-23708  23709 -23710 -632 -23711 0
-23708  23709 -23710 -632 -23712 0
-23708  23709 -23710 -632 -23713 0

c  0+1 --> 1
c    (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧  p_632) -> (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0)
c  in CNF:
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_2
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_1
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨  b^{316, 3}_0
c  in DIMACS:
 23708  23709  23710 -632 -23711 0
 23708  23709  23710 -632 -23712 0
 23708  23709  23710 -632  23713 0

c  1+1 --> 2
c    (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0 ∧  p_632) -> (-b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0)
c  in CNF:
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_2
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨  b^{316, 3}_1
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ -p_632 ∨ -b^{316, 3}_0
c  in DIMACS:
 23708  23709 -23710 -632 -23711 0
 23708  23709 -23710 -632  23712 0
 23708  23709 -23710 -632 -23713 0

c  2+1 --> break 
c    (-b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧  p_632) -> break
c  in CNF:
c     b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ -p_632 ∨ break
c  in DIMACS:
 23708 -23709  23710 -632 1162 0


c  2-1 --> 1
c    (-b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧ -p_632) -> (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0)
c  in CNF:
c     b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_2
c     b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_1
c     b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨  b^{316, 3}_0
c  in DIMACS:
 23708 -23709  23710  632 -23711 0
 23708 -23709  23710  632 -23712 0
 23708 -23709  23710  632  23713 0

c  1-1 --> 0
c    (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0 ∧ -p_632) -> (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧ -b^{316, 3}_0)
c  in CNF:
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_2
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_1
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_0
c  in DIMACS:
 23708  23709 -23710  632 -23711 0
 23708  23709 -23710  632 -23712 0
 23708  23709 -23710  632 -23713 0

c  0-1 --> -1
c    (-b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧ -p_632) -> ( b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0)
c  in CNF:
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨  b^{316, 3}_2
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_1
c     b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨  b^{316, 3}_0
c  in DIMACS:
 23708  23709  23710  632  23711 0
 23708  23709  23710  632 -23712 0
 23708  23709  23710  632  23713 0

c  -1-1 --> -2
c    ( b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧  b^{316, 2}_0 ∧ -p_632) -> ( b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0)
c  in CNF:
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨  b^{316, 3}_2
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨  b^{316, 3}_1
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨  p_632 ∨ -b^{316, 3}_0
c  in DIMACS:
-23708  23709 -23710  632  23711 0
-23708  23709 -23710  632  23712 0
-23708  23709 -23710  632 -23713 0

c  -2-1 --> break 
c    ( b^{316, 2}_2 ∧  b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧ -p_632) -> break
c  in CNF:
c    -b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨  b^{316, 2}_0 ∨  p_632 ∨ break
c  in DIMACS:
-23708 -23709  23710  632 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{316, 2}_2 ∧ -b^{316, 2}_1 ∧ -b^{316, 2}_0 ∧ true) 
c  in CNF:
c    -b^{316, 2}_2 ∨  b^{316, 2}_1 ∨  b^{316, 2}_0 ∨ false 
c  in DIMACS:
-23708  23709  23710  0

c  3 does not represent an automaton state.
c    -(-b^{316, 2}_2 ∧  b^{316, 2}_1 ∧  b^{316, 2}_0 ∧ true) 
c  in CNF:
c     b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ false 
c  in DIMACS:
 23708 -23709 -23710  0
c  -3 does not represent an automaton state.
c    -( b^{316, 2}_2 ∧  b^{316, 2}_1 ∧  b^{316, 2}_0 ∧ true) 
c  in CNF:
c    -b^{316, 2}_2 ∨ -b^{316, 2}_1 ∨ -b^{316, 2}_0 ∨ false 
c  in DIMACS:
-23708 -23709 -23710  0

c i = 3
c  -2+1 --> -1
c    ( b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧  p_948) -> ( b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧  b^{316, 4}_0)
c  in CNF:
c    -b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨  b^{316, 4}_2
c    -b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_1
c    -b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨  b^{316, 4}_0
c  in DIMACS:
-23711 -23712  23713 -948  23714 0
-23711 -23712  23713 -948 -23715 0
-23711 -23712  23713 -948  23716 0

c  -1+1 --> 0
c    ( b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0 ∧  p_948) -> (-b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧ -b^{316, 4}_0)
c  in CNF:
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_2
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_1
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_0
c  in DIMACS:
-23711  23712 -23713 -948 -23714 0
-23711  23712 -23713 -948 -23715 0
-23711  23712 -23713 -948 -23716 0

c  0+1 --> 1
c    (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧  p_948) -> (-b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧  b^{316, 4}_0)
c  in CNF:
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_2
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_1
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨  b^{316, 4}_0
c  in DIMACS:
 23711  23712  23713 -948 -23714 0
 23711  23712  23713 -948 -23715 0
 23711  23712  23713 -948  23716 0

c  1+1 --> 2
c    (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0 ∧  p_948) -> (-b^{316, 4}_2 ∧  b^{316, 4}_1 ∧ -b^{316, 4}_0)
c  in CNF:
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_2
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨  b^{316, 4}_1
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ -p_948 ∨ -b^{316, 4}_0
c  in DIMACS:
 23711  23712 -23713 -948 -23714 0
 23711  23712 -23713 -948  23715 0
 23711  23712 -23713 -948 -23716 0

c  2+1 --> break 
c    (-b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧  p_948) -> break
c  in CNF:
c     b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ -p_948 ∨ break
c  in DIMACS:
 23711 -23712  23713 -948 1162 0


c  2-1 --> 1
c    (-b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧ -p_948) -> (-b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧  b^{316, 4}_0)
c  in CNF:
c     b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_2
c     b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_1
c     b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨  b^{316, 4}_0
c  in DIMACS:
 23711 -23712  23713  948 -23714 0
 23711 -23712  23713  948 -23715 0
 23711 -23712  23713  948  23716 0

c  1-1 --> 0
c    (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0 ∧ -p_948) -> (-b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧ -b^{316, 4}_0)
c  in CNF:
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_2
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_1
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_0
c  in DIMACS:
 23711  23712 -23713  948 -23714 0
 23711  23712 -23713  948 -23715 0
 23711  23712 -23713  948 -23716 0

c  0-1 --> -1
c    (-b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧ -p_948) -> ( b^{316, 4}_2 ∧ -b^{316, 4}_1 ∧  b^{316, 4}_0)
c  in CNF:
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨  b^{316, 4}_2
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_1
c     b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨  b^{316, 4}_0
c  in DIMACS:
 23711  23712  23713  948  23714 0
 23711  23712  23713  948 -23715 0
 23711  23712  23713  948  23716 0

c  -1-1 --> -2
c    ( b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧  b^{316, 3}_0 ∧ -p_948) -> ( b^{316, 4}_2 ∧  b^{316, 4}_1 ∧ -b^{316, 4}_0)
c  in CNF:
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨  b^{316, 4}_2
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨  b^{316, 4}_1
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨  p_948 ∨ -b^{316, 4}_0
c  in DIMACS:
-23711  23712 -23713  948  23714 0
-23711  23712 -23713  948  23715 0
-23711  23712 -23713  948 -23716 0

c  -2-1 --> break 
c    ( b^{316, 3}_2 ∧  b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧ -p_948) -> break
c  in CNF:
c    -b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨  b^{316, 3}_0 ∨  p_948 ∨ break
c  in DIMACS:
-23711 -23712  23713  948 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{316, 3}_2 ∧ -b^{316, 3}_1 ∧ -b^{316, 3}_0 ∧ true) 
c  in CNF:
c    -b^{316, 3}_2 ∨  b^{316, 3}_1 ∨  b^{316, 3}_0 ∨ false 
c  in DIMACS:
-23711  23712  23713  0

c  3 does not represent an automaton state.
c    -(-b^{316, 3}_2 ∧  b^{316, 3}_1 ∧  b^{316, 3}_0 ∧ true) 
c  in CNF:
c     b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ false 
c  in DIMACS:
 23711 -23712 -23713  0
c  -3 does not represent an automaton state.
c    -( b^{316, 3}_2 ∧  b^{316, 3}_1 ∧  b^{316, 3}_0 ∧ true) 
c  in CNF:
c    -b^{316, 3}_2 ∨ -b^{316, 3}_1 ∨ -b^{316, 3}_0 ∨ false 
c  in DIMACS:
-23711 -23712 -23713  0

c INIT for k = 317
c    -b^{317, 1}_2
c    -b^{317, 1}_1
c    -b^{317, 1}_0
c  in DIMACS:
-23717 0
-23718 0
-23719 0

c Transitions for k = 317
c i = 1
c  -2+1 --> -1
c    ( b^{317, 1}_2 ∧  b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧  p_317) -> ( b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0)
c  in CNF:
c    -b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨  b^{317, 2}_2
c    -b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_1
c    -b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨  b^{317, 2}_0
c  in DIMACS:
-23717 -23718  23719 -317  23720 0
-23717 -23718  23719 -317 -23721 0
-23717 -23718  23719 -317  23722 0

c  -1+1 --> 0
c    ( b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧  b^{317, 1}_0 ∧  p_317) -> (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧ -b^{317, 2}_0)
c  in CNF:
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_2
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_1
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_0
c  in DIMACS:
-23717  23718 -23719 -317 -23720 0
-23717  23718 -23719 -317 -23721 0
-23717  23718 -23719 -317 -23722 0

c  0+1 --> 1
c    (-b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧  p_317) -> (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0)
c  in CNF:
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_2
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_1
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨  b^{317, 2}_0
c  in DIMACS:
 23717  23718  23719 -317 -23720 0
 23717  23718  23719 -317 -23721 0
 23717  23718  23719 -317  23722 0

c  1+1 --> 2
c    (-b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧  b^{317, 1}_0 ∧  p_317) -> (-b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0)
c  in CNF:
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_2
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨  b^{317, 2}_1
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ -p_317 ∨ -b^{317, 2}_0
c  in DIMACS:
 23717  23718 -23719 -317 -23720 0
 23717  23718 -23719 -317  23721 0
 23717  23718 -23719 -317 -23722 0

c  2+1 --> break 
c    (-b^{317, 1}_2 ∧  b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧  p_317) -> break
c  in CNF:
c     b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ -p_317 ∨ break
c  in DIMACS:
 23717 -23718  23719 -317 1162 0


c  2-1 --> 1
c    (-b^{317, 1}_2 ∧  b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧ -p_317) -> (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0)
c  in CNF:
c     b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_2
c     b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_1
c     b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨  b^{317, 2}_0
c  in DIMACS:
 23717 -23718  23719  317 -23720 0
 23717 -23718  23719  317 -23721 0
 23717 -23718  23719  317  23722 0

c  1-1 --> 0
c    (-b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧  b^{317, 1}_0 ∧ -p_317) -> (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧ -b^{317, 2}_0)
c  in CNF:
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_2
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_1
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_0
c  in DIMACS:
 23717  23718 -23719  317 -23720 0
 23717  23718 -23719  317 -23721 0
 23717  23718 -23719  317 -23722 0

c  0-1 --> -1
c    (-b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧ -p_317) -> ( b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0)
c  in CNF:
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨  b^{317, 2}_2
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_1
c     b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨  b^{317, 2}_0
c  in DIMACS:
 23717  23718  23719  317  23720 0
 23717  23718  23719  317 -23721 0
 23717  23718  23719  317  23722 0

c  -1-1 --> -2
c    ( b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧  b^{317, 1}_0 ∧ -p_317) -> ( b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0)
c  in CNF:
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨  b^{317, 2}_2
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨  b^{317, 2}_1
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨  p_317 ∨ -b^{317, 2}_0
c  in DIMACS:
-23717  23718 -23719  317  23720 0
-23717  23718 -23719  317  23721 0
-23717  23718 -23719  317 -23722 0

c  -2-1 --> break 
c    ( b^{317, 1}_2 ∧  b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧ -p_317) -> break
c  in CNF:
c    -b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨  b^{317, 1}_0 ∨  p_317 ∨ break
c  in DIMACS:
-23717 -23718  23719  317 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{317, 1}_2 ∧ -b^{317, 1}_1 ∧ -b^{317, 1}_0 ∧ true) 
c  in CNF:
c    -b^{317, 1}_2 ∨  b^{317, 1}_1 ∨  b^{317, 1}_0 ∨ false 
c  in DIMACS:
-23717  23718  23719  0

c  3 does not represent an automaton state.
c    -(-b^{317, 1}_2 ∧  b^{317, 1}_1 ∧  b^{317, 1}_0 ∧ true) 
c  in CNF:
c     b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ false 
c  in DIMACS:
 23717 -23718 -23719  0
c  -3 does not represent an automaton state.
c    -( b^{317, 1}_2 ∧  b^{317, 1}_1 ∧  b^{317, 1}_0 ∧ true) 
c  in CNF:
c    -b^{317, 1}_2 ∨ -b^{317, 1}_1 ∨ -b^{317, 1}_0 ∨ false 
c  in DIMACS:
-23717 -23718 -23719  0

c i = 2
c  -2+1 --> -1
c    ( b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧  p_634) -> ( b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0)
c  in CNF:
c    -b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨  b^{317, 3}_2
c    -b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_1
c    -b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨  b^{317, 3}_0
c  in DIMACS:
-23720 -23721  23722 -634  23723 0
-23720 -23721  23722 -634 -23724 0
-23720 -23721  23722 -634  23725 0

c  -1+1 --> 0
c    ( b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0 ∧  p_634) -> (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧ -b^{317, 3}_0)
c  in CNF:
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_2
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_1
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_0
c  in DIMACS:
-23720  23721 -23722 -634 -23723 0
-23720  23721 -23722 -634 -23724 0
-23720  23721 -23722 -634 -23725 0

c  0+1 --> 1
c    (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧  p_634) -> (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0)
c  in CNF:
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_2
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_1
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨  b^{317, 3}_0
c  in DIMACS:
 23720  23721  23722 -634 -23723 0
 23720  23721  23722 -634 -23724 0
 23720  23721  23722 -634  23725 0

c  1+1 --> 2
c    (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0 ∧  p_634) -> (-b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0)
c  in CNF:
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_2
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨  b^{317, 3}_1
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ -p_634 ∨ -b^{317, 3}_0
c  in DIMACS:
 23720  23721 -23722 -634 -23723 0
 23720  23721 -23722 -634  23724 0
 23720  23721 -23722 -634 -23725 0

c  2+1 --> break 
c    (-b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧  p_634) -> break
c  in CNF:
c     b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ -p_634 ∨ break
c  in DIMACS:
 23720 -23721  23722 -634 1162 0


c  2-1 --> 1
c    (-b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧ -p_634) -> (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0)
c  in CNF:
c     b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_2
c     b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_1
c     b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨  b^{317, 3}_0
c  in DIMACS:
 23720 -23721  23722  634 -23723 0
 23720 -23721  23722  634 -23724 0
 23720 -23721  23722  634  23725 0

c  1-1 --> 0
c    (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0 ∧ -p_634) -> (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧ -b^{317, 3}_0)
c  in CNF:
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_2
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_1
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_0
c  in DIMACS:
 23720  23721 -23722  634 -23723 0
 23720  23721 -23722  634 -23724 0
 23720  23721 -23722  634 -23725 0

c  0-1 --> -1
c    (-b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧ -p_634) -> ( b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0)
c  in CNF:
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨  b^{317, 3}_2
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_1
c     b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨  b^{317, 3}_0
c  in DIMACS:
 23720  23721  23722  634  23723 0
 23720  23721  23722  634 -23724 0
 23720  23721  23722  634  23725 0

c  -1-1 --> -2
c    ( b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧  b^{317, 2}_0 ∧ -p_634) -> ( b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0)
c  in CNF:
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨  b^{317, 3}_2
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨  b^{317, 3}_1
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨  p_634 ∨ -b^{317, 3}_0
c  in DIMACS:
-23720  23721 -23722  634  23723 0
-23720  23721 -23722  634  23724 0
-23720  23721 -23722  634 -23725 0

c  -2-1 --> break 
c    ( b^{317, 2}_2 ∧  b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧ -p_634) -> break
c  in CNF:
c    -b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨  b^{317, 2}_0 ∨  p_634 ∨ break
c  in DIMACS:
-23720 -23721  23722  634 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{317, 2}_2 ∧ -b^{317, 2}_1 ∧ -b^{317, 2}_0 ∧ true) 
c  in CNF:
c    -b^{317, 2}_2 ∨  b^{317, 2}_1 ∨  b^{317, 2}_0 ∨ false 
c  in DIMACS:
-23720  23721  23722  0

c  3 does not represent an automaton state.
c    -(-b^{317, 2}_2 ∧  b^{317, 2}_1 ∧  b^{317, 2}_0 ∧ true) 
c  in CNF:
c     b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ false 
c  in DIMACS:
 23720 -23721 -23722  0
c  -3 does not represent an automaton state.
c    -( b^{317, 2}_2 ∧  b^{317, 2}_1 ∧  b^{317, 2}_0 ∧ true) 
c  in CNF:
c    -b^{317, 2}_2 ∨ -b^{317, 2}_1 ∨ -b^{317, 2}_0 ∨ false 
c  in DIMACS:
-23720 -23721 -23722  0

c i = 3
c  -2+1 --> -1
c    ( b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧  p_951) -> ( b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧  b^{317, 4}_0)
c  in CNF:
c    -b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨  b^{317, 4}_2
c    -b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_1
c    -b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨  b^{317, 4}_0
c  in DIMACS:
-23723 -23724  23725 -951  23726 0
-23723 -23724  23725 -951 -23727 0
-23723 -23724  23725 -951  23728 0

c  -1+1 --> 0
c    ( b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0 ∧  p_951) -> (-b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧ -b^{317, 4}_0)
c  in CNF:
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_2
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_1
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_0
c  in DIMACS:
-23723  23724 -23725 -951 -23726 0
-23723  23724 -23725 -951 -23727 0
-23723  23724 -23725 -951 -23728 0

c  0+1 --> 1
c    (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧  p_951) -> (-b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧  b^{317, 4}_0)
c  in CNF:
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_2
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_1
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨  b^{317, 4}_0
c  in DIMACS:
 23723  23724  23725 -951 -23726 0
 23723  23724  23725 -951 -23727 0
 23723  23724  23725 -951  23728 0

c  1+1 --> 2
c    (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0 ∧  p_951) -> (-b^{317, 4}_2 ∧  b^{317, 4}_1 ∧ -b^{317, 4}_0)
c  in CNF:
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_2
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨  b^{317, 4}_1
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ -p_951 ∨ -b^{317, 4}_0
c  in DIMACS:
 23723  23724 -23725 -951 -23726 0
 23723  23724 -23725 -951  23727 0
 23723  23724 -23725 -951 -23728 0

c  2+1 --> break 
c    (-b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧  p_951) -> break
c  in CNF:
c     b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ -p_951 ∨ break
c  in DIMACS:
 23723 -23724  23725 -951 1162 0


c  2-1 --> 1
c    (-b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧ -p_951) -> (-b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧  b^{317, 4}_0)
c  in CNF:
c     b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_2
c     b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_1
c     b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨  b^{317, 4}_0
c  in DIMACS:
 23723 -23724  23725  951 -23726 0
 23723 -23724  23725  951 -23727 0
 23723 -23724  23725  951  23728 0

c  1-1 --> 0
c    (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0 ∧ -p_951) -> (-b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧ -b^{317, 4}_0)
c  in CNF:
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_2
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_1
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_0
c  in DIMACS:
 23723  23724 -23725  951 -23726 0
 23723  23724 -23725  951 -23727 0
 23723  23724 -23725  951 -23728 0

c  0-1 --> -1
c    (-b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧ -p_951) -> ( b^{317, 4}_2 ∧ -b^{317, 4}_1 ∧  b^{317, 4}_0)
c  in CNF:
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨  b^{317, 4}_2
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_1
c     b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨  b^{317, 4}_0
c  in DIMACS:
 23723  23724  23725  951  23726 0
 23723  23724  23725  951 -23727 0
 23723  23724  23725  951  23728 0

c  -1-1 --> -2
c    ( b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧  b^{317, 3}_0 ∧ -p_951) -> ( b^{317, 4}_2 ∧  b^{317, 4}_1 ∧ -b^{317, 4}_0)
c  in CNF:
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨  b^{317, 4}_2
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨  b^{317, 4}_1
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨  p_951 ∨ -b^{317, 4}_0
c  in DIMACS:
-23723  23724 -23725  951  23726 0
-23723  23724 -23725  951  23727 0
-23723  23724 -23725  951 -23728 0

c  -2-1 --> break 
c    ( b^{317, 3}_2 ∧  b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧ -p_951) -> break
c  in CNF:
c    -b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨  b^{317, 3}_0 ∨  p_951 ∨ break
c  in DIMACS:
-23723 -23724  23725  951 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{317, 3}_2 ∧ -b^{317, 3}_1 ∧ -b^{317, 3}_0 ∧ true) 
c  in CNF:
c    -b^{317, 3}_2 ∨  b^{317, 3}_1 ∨  b^{317, 3}_0 ∨ false 
c  in DIMACS:
-23723  23724  23725  0

c  3 does not represent an automaton state.
c    -(-b^{317, 3}_2 ∧  b^{317, 3}_1 ∧  b^{317, 3}_0 ∧ true) 
c  in CNF:
c     b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ false 
c  in DIMACS:
 23723 -23724 -23725  0
c  -3 does not represent an automaton state.
c    -( b^{317, 3}_2 ∧  b^{317, 3}_1 ∧  b^{317, 3}_0 ∧ true) 
c  in CNF:
c    -b^{317, 3}_2 ∨ -b^{317, 3}_1 ∨ -b^{317, 3}_0 ∨ false 
c  in DIMACS:
-23723 -23724 -23725  0

c INIT for k = 318
c    -b^{318, 1}_2
c    -b^{318, 1}_1
c    -b^{318, 1}_0
c  in DIMACS:
-23729 0
-23730 0
-23731 0

c Transitions for k = 318
c i = 1
c  -2+1 --> -1
c    ( b^{318, 1}_2 ∧  b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧  p_318) -> ( b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0)
c  in CNF:
c    -b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨  b^{318, 2}_2
c    -b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_1
c    -b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨  b^{318, 2}_0
c  in DIMACS:
-23729 -23730  23731 -318  23732 0
-23729 -23730  23731 -318 -23733 0
-23729 -23730  23731 -318  23734 0

c  -1+1 --> 0
c    ( b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧  b^{318, 1}_0 ∧  p_318) -> (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧ -b^{318, 2}_0)
c  in CNF:
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_2
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_1
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_0
c  in DIMACS:
-23729  23730 -23731 -318 -23732 0
-23729  23730 -23731 -318 -23733 0
-23729  23730 -23731 -318 -23734 0

c  0+1 --> 1
c    (-b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧  p_318) -> (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0)
c  in CNF:
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_2
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_1
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨  b^{318, 2}_0
c  in DIMACS:
 23729  23730  23731 -318 -23732 0
 23729  23730  23731 -318 -23733 0
 23729  23730  23731 -318  23734 0

c  1+1 --> 2
c    (-b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧  b^{318, 1}_0 ∧  p_318) -> (-b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0)
c  in CNF:
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_2
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨  b^{318, 2}_1
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ -p_318 ∨ -b^{318, 2}_0
c  in DIMACS:
 23729  23730 -23731 -318 -23732 0
 23729  23730 -23731 -318  23733 0
 23729  23730 -23731 -318 -23734 0

c  2+1 --> break 
c    (-b^{318, 1}_2 ∧  b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧  p_318) -> break
c  in CNF:
c     b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ -p_318 ∨ break
c  in DIMACS:
 23729 -23730  23731 -318 1162 0


c  2-1 --> 1
c    (-b^{318, 1}_2 ∧  b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧ -p_318) -> (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0)
c  in CNF:
c     b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_2
c     b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_1
c     b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨  b^{318, 2}_0
c  in DIMACS:
 23729 -23730  23731  318 -23732 0
 23729 -23730  23731  318 -23733 0
 23729 -23730  23731  318  23734 0

c  1-1 --> 0
c    (-b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧  b^{318, 1}_0 ∧ -p_318) -> (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧ -b^{318, 2}_0)
c  in CNF:
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_2
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_1
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_0
c  in DIMACS:
 23729  23730 -23731  318 -23732 0
 23729  23730 -23731  318 -23733 0
 23729  23730 -23731  318 -23734 0

c  0-1 --> -1
c    (-b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧ -p_318) -> ( b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0)
c  in CNF:
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨  b^{318, 2}_2
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_1
c     b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨  b^{318, 2}_0
c  in DIMACS:
 23729  23730  23731  318  23732 0
 23729  23730  23731  318 -23733 0
 23729  23730  23731  318  23734 0

c  -1-1 --> -2
c    ( b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧  b^{318, 1}_0 ∧ -p_318) -> ( b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0)
c  in CNF:
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨  b^{318, 2}_2
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨  b^{318, 2}_1
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨  p_318 ∨ -b^{318, 2}_0
c  in DIMACS:
-23729  23730 -23731  318  23732 0
-23729  23730 -23731  318  23733 0
-23729  23730 -23731  318 -23734 0

c  -2-1 --> break 
c    ( b^{318, 1}_2 ∧  b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧ -p_318) -> break
c  in CNF:
c    -b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨  b^{318, 1}_0 ∨  p_318 ∨ break
c  in DIMACS:
-23729 -23730  23731  318 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{318, 1}_2 ∧ -b^{318, 1}_1 ∧ -b^{318, 1}_0 ∧ true) 
c  in CNF:
c    -b^{318, 1}_2 ∨  b^{318, 1}_1 ∨  b^{318, 1}_0 ∨ false 
c  in DIMACS:
-23729  23730  23731  0

c  3 does not represent an automaton state.
c    -(-b^{318, 1}_2 ∧  b^{318, 1}_1 ∧  b^{318, 1}_0 ∧ true) 
c  in CNF:
c     b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ false 
c  in DIMACS:
 23729 -23730 -23731  0
c  -3 does not represent an automaton state.
c    -( b^{318, 1}_2 ∧  b^{318, 1}_1 ∧  b^{318, 1}_0 ∧ true) 
c  in CNF:
c    -b^{318, 1}_2 ∨ -b^{318, 1}_1 ∨ -b^{318, 1}_0 ∨ false 
c  in DIMACS:
-23729 -23730 -23731  0

c i = 2
c  -2+1 --> -1
c    ( b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧  p_636) -> ( b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0)
c  in CNF:
c    -b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨  b^{318, 3}_2
c    -b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_1
c    -b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨  b^{318, 3}_0
c  in DIMACS:
-23732 -23733  23734 -636  23735 0
-23732 -23733  23734 -636 -23736 0
-23732 -23733  23734 -636  23737 0

c  -1+1 --> 0
c    ( b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0 ∧  p_636) -> (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧ -b^{318, 3}_0)
c  in CNF:
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_2
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_1
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_0
c  in DIMACS:
-23732  23733 -23734 -636 -23735 0
-23732  23733 -23734 -636 -23736 0
-23732  23733 -23734 -636 -23737 0

c  0+1 --> 1
c    (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧  p_636) -> (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0)
c  in CNF:
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_2
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_1
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨  b^{318, 3}_0
c  in DIMACS:
 23732  23733  23734 -636 -23735 0
 23732  23733  23734 -636 -23736 0
 23732  23733  23734 -636  23737 0

c  1+1 --> 2
c    (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0 ∧  p_636) -> (-b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0)
c  in CNF:
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_2
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨  b^{318, 3}_1
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ -p_636 ∨ -b^{318, 3}_0
c  in DIMACS:
 23732  23733 -23734 -636 -23735 0
 23732  23733 -23734 -636  23736 0
 23732  23733 -23734 -636 -23737 0

c  2+1 --> break 
c    (-b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧  p_636) -> break
c  in CNF:
c     b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ -p_636 ∨ break
c  in DIMACS:
 23732 -23733  23734 -636 1162 0


c  2-1 --> 1
c    (-b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧ -p_636) -> (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0)
c  in CNF:
c     b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_2
c     b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_1
c     b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨  b^{318, 3}_0
c  in DIMACS:
 23732 -23733  23734  636 -23735 0
 23732 -23733  23734  636 -23736 0
 23732 -23733  23734  636  23737 0

c  1-1 --> 0
c    (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0 ∧ -p_636) -> (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧ -b^{318, 3}_0)
c  in CNF:
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_2
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_1
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_0
c  in DIMACS:
 23732  23733 -23734  636 -23735 0
 23732  23733 -23734  636 -23736 0
 23732  23733 -23734  636 -23737 0

c  0-1 --> -1
c    (-b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧ -p_636) -> ( b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0)
c  in CNF:
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨  b^{318, 3}_2
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_1
c     b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨  b^{318, 3}_0
c  in DIMACS:
 23732  23733  23734  636  23735 0
 23732  23733  23734  636 -23736 0
 23732  23733  23734  636  23737 0

c  -1-1 --> -2
c    ( b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧  b^{318, 2}_0 ∧ -p_636) -> ( b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0)
c  in CNF:
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨  b^{318, 3}_2
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨  b^{318, 3}_1
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨  p_636 ∨ -b^{318, 3}_0
c  in DIMACS:
-23732  23733 -23734  636  23735 0
-23732  23733 -23734  636  23736 0
-23732  23733 -23734  636 -23737 0

c  -2-1 --> break 
c    ( b^{318, 2}_2 ∧  b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧ -p_636) -> break
c  in CNF:
c    -b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨  b^{318, 2}_0 ∨  p_636 ∨ break
c  in DIMACS:
-23732 -23733  23734  636 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{318, 2}_2 ∧ -b^{318, 2}_1 ∧ -b^{318, 2}_0 ∧ true) 
c  in CNF:
c    -b^{318, 2}_2 ∨  b^{318, 2}_1 ∨  b^{318, 2}_0 ∨ false 
c  in DIMACS:
-23732  23733  23734  0

c  3 does not represent an automaton state.
c    -(-b^{318, 2}_2 ∧  b^{318, 2}_1 ∧  b^{318, 2}_0 ∧ true) 
c  in CNF:
c     b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ false 
c  in DIMACS:
 23732 -23733 -23734  0
c  -3 does not represent an automaton state.
c    -( b^{318, 2}_2 ∧  b^{318, 2}_1 ∧  b^{318, 2}_0 ∧ true) 
c  in CNF:
c    -b^{318, 2}_2 ∨ -b^{318, 2}_1 ∨ -b^{318, 2}_0 ∨ false 
c  in DIMACS:
-23732 -23733 -23734  0

c i = 3
c  -2+1 --> -1
c    ( b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧  p_954) -> ( b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧  b^{318, 4}_0)
c  in CNF:
c    -b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨  b^{318, 4}_2
c    -b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_1
c    -b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨  b^{318, 4}_0
c  in DIMACS:
-23735 -23736  23737 -954  23738 0
-23735 -23736  23737 -954 -23739 0
-23735 -23736  23737 -954  23740 0

c  -1+1 --> 0
c    ( b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0 ∧  p_954) -> (-b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧ -b^{318, 4}_0)
c  in CNF:
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_2
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_1
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_0
c  in DIMACS:
-23735  23736 -23737 -954 -23738 0
-23735  23736 -23737 -954 -23739 0
-23735  23736 -23737 -954 -23740 0

c  0+1 --> 1
c    (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧  p_954) -> (-b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧  b^{318, 4}_0)
c  in CNF:
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_2
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_1
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨  b^{318, 4}_0
c  in DIMACS:
 23735  23736  23737 -954 -23738 0
 23735  23736  23737 -954 -23739 0
 23735  23736  23737 -954  23740 0

c  1+1 --> 2
c    (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0 ∧  p_954) -> (-b^{318, 4}_2 ∧  b^{318, 4}_1 ∧ -b^{318, 4}_0)
c  in CNF:
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_2
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨  b^{318, 4}_1
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ -p_954 ∨ -b^{318, 4}_0
c  in DIMACS:
 23735  23736 -23737 -954 -23738 0
 23735  23736 -23737 -954  23739 0
 23735  23736 -23737 -954 -23740 0

c  2+1 --> break 
c    (-b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧  p_954) -> break
c  in CNF:
c     b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ -p_954 ∨ break
c  in DIMACS:
 23735 -23736  23737 -954 1162 0


c  2-1 --> 1
c    (-b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧ -p_954) -> (-b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧  b^{318, 4}_0)
c  in CNF:
c     b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_2
c     b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_1
c     b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨  b^{318, 4}_0
c  in DIMACS:
 23735 -23736  23737  954 -23738 0
 23735 -23736  23737  954 -23739 0
 23735 -23736  23737  954  23740 0

c  1-1 --> 0
c    (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0 ∧ -p_954) -> (-b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧ -b^{318, 4}_0)
c  in CNF:
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_2
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_1
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_0
c  in DIMACS:
 23735  23736 -23737  954 -23738 0
 23735  23736 -23737  954 -23739 0
 23735  23736 -23737  954 -23740 0

c  0-1 --> -1
c    (-b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧ -p_954) -> ( b^{318, 4}_2 ∧ -b^{318, 4}_1 ∧  b^{318, 4}_0)
c  in CNF:
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨  b^{318, 4}_2
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_1
c     b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨  b^{318, 4}_0
c  in DIMACS:
 23735  23736  23737  954  23738 0
 23735  23736  23737  954 -23739 0
 23735  23736  23737  954  23740 0

c  -1-1 --> -2
c    ( b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧  b^{318, 3}_0 ∧ -p_954) -> ( b^{318, 4}_2 ∧  b^{318, 4}_1 ∧ -b^{318, 4}_0)
c  in CNF:
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨  b^{318, 4}_2
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨  b^{318, 4}_1
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨  p_954 ∨ -b^{318, 4}_0
c  in DIMACS:
-23735  23736 -23737  954  23738 0
-23735  23736 -23737  954  23739 0
-23735  23736 -23737  954 -23740 0

c  -2-1 --> break 
c    ( b^{318, 3}_2 ∧  b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧ -p_954) -> break
c  in CNF:
c    -b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨  b^{318, 3}_0 ∨  p_954 ∨ break
c  in DIMACS:
-23735 -23736  23737  954 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{318, 3}_2 ∧ -b^{318, 3}_1 ∧ -b^{318, 3}_0 ∧ true) 
c  in CNF:
c    -b^{318, 3}_2 ∨  b^{318, 3}_1 ∨  b^{318, 3}_0 ∨ false 
c  in DIMACS:
-23735  23736  23737  0

c  3 does not represent an automaton state.
c    -(-b^{318, 3}_2 ∧  b^{318, 3}_1 ∧  b^{318, 3}_0 ∧ true) 
c  in CNF:
c     b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ false 
c  in DIMACS:
 23735 -23736 -23737  0
c  -3 does not represent an automaton state.
c    -( b^{318, 3}_2 ∧  b^{318, 3}_1 ∧  b^{318, 3}_0 ∧ true) 
c  in CNF:
c    -b^{318, 3}_2 ∨ -b^{318, 3}_1 ∨ -b^{318, 3}_0 ∨ false 
c  in DIMACS:
-23735 -23736 -23737  0

c INIT for k = 319
c    -b^{319, 1}_2
c    -b^{319, 1}_1
c    -b^{319, 1}_0
c  in DIMACS:
-23741 0
-23742 0
-23743 0

c Transitions for k = 319
c i = 1
c  -2+1 --> -1
c    ( b^{319, 1}_2 ∧  b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧  p_319) -> ( b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0)
c  in CNF:
c    -b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨  b^{319, 2}_2
c    -b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_1
c    -b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨  b^{319, 2}_0
c  in DIMACS:
-23741 -23742  23743 -319  23744 0
-23741 -23742  23743 -319 -23745 0
-23741 -23742  23743 -319  23746 0

c  -1+1 --> 0
c    ( b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧  b^{319, 1}_0 ∧  p_319) -> (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧ -b^{319, 2}_0)
c  in CNF:
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_2
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_1
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_0
c  in DIMACS:
-23741  23742 -23743 -319 -23744 0
-23741  23742 -23743 -319 -23745 0
-23741  23742 -23743 -319 -23746 0

c  0+1 --> 1
c    (-b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧  p_319) -> (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0)
c  in CNF:
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_2
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_1
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨  b^{319, 2}_0
c  in DIMACS:
 23741  23742  23743 -319 -23744 0
 23741  23742  23743 -319 -23745 0
 23741  23742  23743 -319  23746 0

c  1+1 --> 2
c    (-b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧  b^{319, 1}_0 ∧  p_319) -> (-b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0)
c  in CNF:
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_2
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨  b^{319, 2}_1
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ -p_319 ∨ -b^{319, 2}_0
c  in DIMACS:
 23741  23742 -23743 -319 -23744 0
 23741  23742 -23743 -319  23745 0
 23741  23742 -23743 -319 -23746 0

c  2+1 --> break 
c    (-b^{319, 1}_2 ∧  b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧  p_319) -> break
c  in CNF:
c     b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ -p_319 ∨ break
c  in DIMACS:
 23741 -23742  23743 -319 1162 0


c  2-1 --> 1
c    (-b^{319, 1}_2 ∧  b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧ -p_319) -> (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0)
c  in CNF:
c     b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_2
c     b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_1
c     b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨  b^{319, 2}_0
c  in DIMACS:
 23741 -23742  23743  319 -23744 0
 23741 -23742  23743  319 -23745 0
 23741 -23742  23743  319  23746 0

c  1-1 --> 0
c    (-b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧  b^{319, 1}_0 ∧ -p_319) -> (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧ -b^{319, 2}_0)
c  in CNF:
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_2
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_1
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_0
c  in DIMACS:
 23741  23742 -23743  319 -23744 0
 23741  23742 -23743  319 -23745 0
 23741  23742 -23743  319 -23746 0

c  0-1 --> -1
c    (-b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧ -p_319) -> ( b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0)
c  in CNF:
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨  b^{319, 2}_2
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_1
c     b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨  b^{319, 2}_0
c  in DIMACS:
 23741  23742  23743  319  23744 0
 23741  23742  23743  319 -23745 0
 23741  23742  23743  319  23746 0

c  -1-1 --> -2
c    ( b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧  b^{319, 1}_0 ∧ -p_319) -> ( b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0)
c  in CNF:
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨  b^{319, 2}_2
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨  b^{319, 2}_1
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨  p_319 ∨ -b^{319, 2}_0
c  in DIMACS:
-23741  23742 -23743  319  23744 0
-23741  23742 -23743  319  23745 0
-23741  23742 -23743  319 -23746 0

c  -2-1 --> break 
c    ( b^{319, 1}_2 ∧  b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧ -p_319) -> break
c  in CNF:
c    -b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨  b^{319, 1}_0 ∨  p_319 ∨ break
c  in DIMACS:
-23741 -23742  23743  319 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{319, 1}_2 ∧ -b^{319, 1}_1 ∧ -b^{319, 1}_0 ∧ true) 
c  in CNF:
c    -b^{319, 1}_2 ∨  b^{319, 1}_1 ∨  b^{319, 1}_0 ∨ false 
c  in DIMACS:
-23741  23742  23743  0

c  3 does not represent an automaton state.
c    -(-b^{319, 1}_2 ∧  b^{319, 1}_1 ∧  b^{319, 1}_0 ∧ true) 
c  in CNF:
c     b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ false 
c  in DIMACS:
 23741 -23742 -23743  0
c  -3 does not represent an automaton state.
c    -( b^{319, 1}_2 ∧  b^{319, 1}_1 ∧  b^{319, 1}_0 ∧ true) 
c  in CNF:
c    -b^{319, 1}_2 ∨ -b^{319, 1}_1 ∨ -b^{319, 1}_0 ∨ false 
c  in DIMACS:
-23741 -23742 -23743  0

c i = 2
c  -2+1 --> -1
c    ( b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧  p_638) -> ( b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0)
c  in CNF:
c    -b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨  b^{319, 3}_2
c    -b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_1
c    -b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨  b^{319, 3}_0
c  in DIMACS:
-23744 -23745  23746 -638  23747 0
-23744 -23745  23746 -638 -23748 0
-23744 -23745  23746 -638  23749 0

c  -1+1 --> 0
c    ( b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0 ∧  p_638) -> (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧ -b^{319, 3}_0)
c  in CNF:
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_2
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_1
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_0
c  in DIMACS:
-23744  23745 -23746 -638 -23747 0
-23744  23745 -23746 -638 -23748 0
-23744  23745 -23746 -638 -23749 0

c  0+1 --> 1
c    (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧  p_638) -> (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0)
c  in CNF:
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_2
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_1
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨  b^{319, 3}_0
c  in DIMACS:
 23744  23745  23746 -638 -23747 0
 23744  23745  23746 -638 -23748 0
 23744  23745  23746 -638  23749 0

c  1+1 --> 2
c    (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0 ∧  p_638) -> (-b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0)
c  in CNF:
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_2
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨  b^{319, 3}_1
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ -p_638 ∨ -b^{319, 3}_0
c  in DIMACS:
 23744  23745 -23746 -638 -23747 0
 23744  23745 -23746 -638  23748 0
 23744  23745 -23746 -638 -23749 0

c  2+1 --> break 
c    (-b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧  p_638) -> break
c  in CNF:
c     b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ -p_638 ∨ break
c  in DIMACS:
 23744 -23745  23746 -638 1162 0


c  2-1 --> 1
c    (-b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧ -p_638) -> (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0)
c  in CNF:
c     b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_2
c     b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_1
c     b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨  b^{319, 3}_0
c  in DIMACS:
 23744 -23745  23746  638 -23747 0
 23744 -23745  23746  638 -23748 0
 23744 -23745  23746  638  23749 0

c  1-1 --> 0
c    (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0 ∧ -p_638) -> (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧ -b^{319, 3}_0)
c  in CNF:
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_2
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_1
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_0
c  in DIMACS:
 23744  23745 -23746  638 -23747 0
 23744  23745 -23746  638 -23748 0
 23744  23745 -23746  638 -23749 0

c  0-1 --> -1
c    (-b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧ -p_638) -> ( b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0)
c  in CNF:
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨  b^{319, 3}_2
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_1
c     b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨  b^{319, 3}_0
c  in DIMACS:
 23744  23745  23746  638  23747 0
 23744  23745  23746  638 -23748 0
 23744  23745  23746  638  23749 0

c  -1-1 --> -2
c    ( b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧  b^{319, 2}_0 ∧ -p_638) -> ( b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0)
c  in CNF:
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨  b^{319, 3}_2
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨  b^{319, 3}_1
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨  p_638 ∨ -b^{319, 3}_0
c  in DIMACS:
-23744  23745 -23746  638  23747 0
-23744  23745 -23746  638  23748 0
-23744  23745 -23746  638 -23749 0

c  -2-1 --> break 
c    ( b^{319, 2}_2 ∧  b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧ -p_638) -> break
c  in CNF:
c    -b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨  b^{319, 2}_0 ∨  p_638 ∨ break
c  in DIMACS:
-23744 -23745  23746  638 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{319, 2}_2 ∧ -b^{319, 2}_1 ∧ -b^{319, 2}_0 ∧ true) 
c  in CNF:
c    -b^{319, 2}_2 ∨  b^{319, 2}_1 ∨  b^{319, 2}_0 ∨ false 
c  in DIMACS:
-23744  23745  23746  0

c  3 does not represent an automaton state.
c    -(-b^{319, 2}_2 ∧  b^{319, 2}_1 ∧  b^{319, 2}_0 ∧ true) 
c  in CNF:
c     b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ false 
c  in DIMACS:
 23744 -23745 -23746  0
c  -3 does not represent an automaton state.
c    -( b^{319, 2}_2 ∧  b^{319, 2}_1 ∧  b^{319, 2}_0 ∧ true) 
c  in CNF:
c    -b^{319, 2}_2 ∨ -b^{319, 2}_1 ∨ -b^{319, 2}_0 ∨ false 
c  in DIMACS:
-23744 -23745 -23746  0

c i = 3
c  -2+1 --> -1
c    ( b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧  p_957) -> ( b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧  b^{319, 4}_0)
c  in CNF:
c    -b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨  b^{319, 4}_2
c    -b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_1
c    -b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨  b^{319, 4}_0
c  in DIMACS:
-23747 -23748  23749 -957  23750 0
-23747 -23748  23749 -957 -23751 0
-23747 -23748  23749 -957  23752 0

c  -1+1 --> 0
c    ( b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0 ∧  p_957) -> (-b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧ -b^{319, 4}_0)
c  in CNF:
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_2
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_1
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_0
c  in DIMACS:
-23747  23748 -23749 -957 -23750 0
-23747  23748 -23749 -957 -23751 0
-23747  23748 -23749 -957 -23752 0

c  0+1 --> 1
c    (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧  p_957) -> (-b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧  b^{319, 4}_0)
c  in CNF:
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_2
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_1
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨  b^{319, 4}_0
c  in DIMACS:
 23747  23748  23749 -957 -23750 0
 23747  23748  23749 -957 -23751 0
 23747  23748  23749 -957  23752 0

c  1+1 --> 2
c    (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0 ∧  p_957) -> (-b^{319, 4}_2 ∧  b^{319, 4}_1 ∧ -b^{319, 4}_0)
c  in CNF:
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_2
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨  b^{319, 4}_1
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ -p_957 ∨ -b^{319, 4}_0
c  in DIMACS:
 23747  23748 -23749 -957 -23750 0
 23747  23748 -23749 -957  23751 0
 23747  23748 -23749 -957 -23752 0

c  2+1 --> break 
c    (-b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧  p_957) -> break
c  in CNF:
c     b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ -p_957 ∨ break
c  in DIMACS:
 23747 -23748  23749 -957 1162 0


c  2-1 --> 1
c    (-b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧ -p_957) -> (-b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧  b^{319, 4}_0)
c  in CNF:
c     b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_2
c     b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_1
c     b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨  b^{319, 4}_0
c  in DIMACS:
 23747 -23748  23749  957 -23750 0
 23747 -23748  23749  957 -23751 0
 23747 -23748  23749  957  23752 0

c  1-1 --> 0
c    (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0 ∧ -p_957) -> (-b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧ -b^{319, 4}_0)
c  in CNF:
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_2
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_1
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_0
c  in DIMACS:
 23747  23748 -23749  957 -23750 0
 23747  23748 -23749  957 -23751 0
 23747  23748 -23749  957 -23752 0

c  0-1 --> -1
c    (-b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧ -p_957) -> ( b^{319, 4}_2 ∧ -b^{319, 4}_1 ∧  b^{319, 4}_0)
c  in CNF:
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨  b^{319, 4}_2
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_1
c     b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨  b^{319, 4}_0
c  in DIMACS:
 23747  23748  23749  957  23750 0
 23747  23748  23749  957 -23751 0
 23747  23748  23749  957  23752 0

c  -1-1 --> -2
c    ( b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧  b^{319, 3}_0 ∧ -p_957) -> ( b^{319, 4}_2 ∧  b^{319, 4}_1 ∧ -b^{319, 4}_0)
c  in CNF:
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨  b^{319, 4}_2
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨  b^{319, 4}_1
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨  p_957 ∨ -b^{319, 4}_0
c  in DIMACS:
-23747  23748 -23749  957  23750 0
-23747  23748 -23749  957  23751 0
-23747  23748 -23749  957 -23752 0

c  -2-1 --> break 
c    ( b^{319, 3}_2 ∧  b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧ -p_957) -> break
c  in CNF:
c    -b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨  b^{319, 3}_0 ∨  p_957 ∨ break
c  in DIMACS:
-23747 -23748  23749  957 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{319, 3}_2 ∧ -b^{319, 3}_1 ∧ -b^{319, 3}_0 ∧ true) 
c  in CNF:
c    -b^{319, 3}_2 ∨  b^{319, 3}_1 ∨  b^{319, 3}_0 ∨ false 
c  in DIMACS:
-23747  23748  23749  0

c  3 does not represent an automaton state.
c    -(-b^{319, 3}_2 ∧  b^{319, 3}_1 ∧  b^{319, 3}_0 ∧ true) 
c  in CNF:
c     b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ false 
c  in DIMACS:
 23747 -23748 -23749  0
c  -3 does not represent an automaton state.
c    -( b^{319, 3}_2 ∧  b^{319, 3}_1 ∧  b^{319, 3}_0 ∧ true) 
c  in CNF:
c    -b^{319, 3}_2 ∨ -b^{319, 3}_1 ∨ -b^{319, 3}_0 ∨ false 
c  in DIMACS:
-23747 -23748 -23749  0

c INIT for k = 320
c    -b^{320, 1}_2
c    -b^{320, 1}_1
c    -b^{320, 1}_0
c  in DIMACS:
-23753 0
-23754 0
-23755 0

c Transitions for k = 320
c i = 1
c  -2+1 --> -1
c    ( b^{320, 1}_2 ∧  b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧  p_320) -> ( b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0)
c  in CNF:
c    -b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨  b^{320, 2}_2
c    -b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_1
c    -b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨  b^{320, 2}_0
c  in DIMACS:
-23753 -23754  23755 -320  23756 0
-23753 -23754  23755 -320 -23757 0
-23753 -23754  23755 -320  23758 0

c  -1+1 --> 0
c    ( b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧  b^{320, 1}_0 ∧  p_320) -> (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧ -b^{320, 2}_0)
c  in CNF:
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_2
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_1
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_0
c  in DIMACS:
-23753  23754 -23755 -320 -23756 0
-23753  23754 -23755 -320 -23757 0
-23753  23754 -23755 -320 -23758 0

c  0+1 --> 1
c    (-b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧  p_320) -> (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0)
c  in CNF:
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_2
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_1
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨  b^{320, 2}_0
c  in DIMACS:
 23753  23754  23755 -320 -23756 0
 23753  23754  23755 -320 -23757 0
 23753  23754  23755 -320  23758 0

c  1+1 --> 2
c    (-b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧  b^{320, 1}_0 ∧  p_320) -> (-b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0)
c  in CNF:
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_2
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨  b^{320, 2}_1
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ -p_320 ∨ -b^{320, 2}_0
c  in DIMACS:
 23753  23754 -23755 -320 -23756 0
 23753  23754 -23755 -320  23757 0
 23753  23754 -23755 -320 -23758 0

c  2+1 --> break 
c    (-b^{320, 1}_2 ∧  b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧  p_320) -> break
c  in CNF:
c     b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ -p_320 ∨ break
c  in DIMACS:
 23753 -23754  23755 -320 1162 0


c  2-1 --> 1
c    (-b^{320, 1}_2 ∧  b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧ -p_320) -> (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0)
c  in CNF:
c     b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_2
c     b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_1
c     b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨  b^{320, 2}_0
c  in DIMACS:
 23753 -23754  23755  320 -23756 0
 23753 -23754  23755  320 -23757 0
 23753 -23754  23755  320  23758 0

c  1-1 --> 0
c    (-b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧  b^{320, 1}_0 ∧ -p_320) -> (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧ -b^{320, 2}_0)
c  in CNF:
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_2
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_1
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_0
c  in DIMACS:
 23753  23754 -23755  320 -23756 0
 23753  23754 -23755  320 -23757 0
 23753  23754 -23755  320 -23758 0

c  0-1 --> -1
c    (-b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧ -p_320) -> ( b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0)
c  in CNF:
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨  b^{320, 2}_2
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_1
c     b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨  b^{320, 2}_0
c  in DIMACS:
 23753  23754  23755  320  23756 0
 23753  23754  23755  320 -23757 0
 23753  23754  23755  320  23758 0

c  -1-1 --> -2
c    ( b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧  b^{320, 1}_0 ∧ -p_320) -> ( b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0)
c  in CNF:
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨  b^{320, 2}_2
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨  b^{320, 2}_1
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨  p_320 ∨ -b^{320, 2}_0
c  in DIMACS:
-23753  23754 -23755  320  23756 0
-23753  23754 -23755  320  23757 0
-23753  23754 -23755  320 -23758 0

c  -2-1 --> break 
c    ( b^{320, 1}_2 ∧  b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧ -p_320) -> break
c  in CNF:
c    -b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨  b^{320, 1}_0 ∨  p_320 ∨ break
c  in DIMACS:
-23753 -23754  23755  320 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{320, 1}_2 ∧ -b^{320, 1}_1 ∧ -b^{320, 1}_0 ∧ true) 
c  in CNF:
c    -b^{320, 1}_2 ∨  b^{320, 1}_1 ∨  b^{320, 1}_0 ∨ false 
c  in DIMACS:
-23753  23754  23755  0

c  3 does not represent an automaton state.
c    -(-b^{320, 1}_2 ∧  b^{320, 1}_1 ∧  b^{320, 1}_0 ∧ true) 
c  in CNF:
c     b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ false 
c  in DIMACS:
 23753 -23754 -23755  0
c  -3 does not represent an automaton state.
c    -( b^{320, 1}_2 ∧  b^{320, 1}_1 ∧  b^{320, 1}_0 ∧ true) 
c  in CNF:
c    -b^{320, 1}_2 ∨ -b^{320, 1}_1 ∨ -b^{320, 1}_0 ∨ false 
c  in DIMACS:
-23753 -23754 -23755  0

c i = 2
c  -2+1 --> -1
c    ( b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧  p_640) -> ( b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0)
c  in CNF:
c    -b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨  b^{320, 3}_2
c    -b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_1
c    -b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨  b^{320, 3}_0
c  in DIMACS:
-23756 -23757  23758 -640  23759 0
-23756 -23757  23758 -640 -23760 0
-23756 -23757  23758 -640  23761 0

c  -1+1 --> 0
c    ( b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0 ∧  p_640) -> (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧ -b^{320, 3}_0)
c  in CNF:
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_2
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_1
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_0
c  in DIMACS:
-23756  23757 -23758 -640 -23759 0
-23756  23757 -23758 -640 -23760 0
-23756  23757 -23758 -640 -23761 0

c  0+1 --> 1
c    (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧  p_640) -> (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0)
c  in CNF:
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_2
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_1
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨  b^{320, 3}_0
c  in DIMACS:
 23756  23757  23758 -640 -23759 0
 23756  23757  23758 -640 -23760 0
 23756  23757  23758 -640  23761 0

c  1+1 --> 2
c    (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0 ∧  p_640) -> (-b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0)
c  in CNF:
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_2
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨  b^{320, 3}_1
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ -p_640 ∨ -b^{320, 3}_0
c  in DIMACS:
 23756  23757 -23758 -640 -23759 0
 23756  23757 -23758 -640  23760 0
 23756  23757 -23758 -640 -23761 0

c  2+1 --> break 
c    (-b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧  p_640) -> break
c  in CNF:
c     b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ -p_640 ∨ break
c  in DIMACS:
 23756 -23757  23758 -640 1162 0


c  2-1 --> 1
c    (-b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧ -p_640) -> (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0)
c  in CNF:
c     b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_2
c     b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_1
c     b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨  b^{320, 3}_0
c  in DIMACS:
 23756 -23757  23758  640 -23759 0
 23756 -23757  23758  640 -23760 0
 23756 -23757  23758  640  23761 0

c  1-1 --> 0
c    (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0 ∧ -p_640) -> (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧ -b^{320, 3}_0)
c  in CNF:
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_2
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_1
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_0
c  in DIMACS:
 23756  23757 -23758  640 -23759 0
 23756  23757 -23758  640 -23760 0
 23756  23757 -23758  640 -23761 0

c  0-1 --> -1
c    (-b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧ -p_640) -> ( b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0)
c  in CNF:
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨  b^{320, 3}_2
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_1
c     b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨  b^{320, 3}_0
c  in DIMACS:
 23756  23757  23758  640  23759 0
 23756  23757  23758  640 -23760 0
 23756  23757  23758  640  23761 0

c  -1-1 --> -2
c    ( b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧  b^{320, 2}_0 ∧ -p_640) -> ( b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0)
c  in CNF:
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨  b^{320, 3}_2
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨  b^{320, 3}_1
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨  p_640 ∨ -b^{320, 3}_0
c  in DIMACS:
-23756  23757 -23758  640  23759 0
-23756  23757 -23758  640  23760 0
-23756  23757 -23758  640 -23761 0

c  -2-1 --> break 
c    ( b^{320, 2}_2 ∧  b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧ -p_640) -> break
c  in CNF:
c    -b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨  b^{320, 2}_0 ∨  p_640 ∨ break
c  in DIMACS:
-23756 -23757  23758  640 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{320, 2}_2 ∧ -b^{320, 2}_1 ∧ -b^{320, 2}_0 ∧ true) 
c  in CNF:
c    -b^{320, 2}_2 ∨  b^{320, 2}_1 ∨  b^{320, 2}_0 ∨ false 
c  in DIMACS:
-23756  23757  23758  0

c  3 does not represent an automaton state.
c    -(-b^{320, 2}_2 ∧  b^{320, 2}_1 ∧  b^{320, 2}_0 ∧ true) 
c  in CNF:
c     b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ false 
c  in DIMACS:
 23756 -23757 -23758  0
c  -3 does not represent an automaton state.
c    -( b^{320, 2}_2 ∧  b^{320, 2}_1 ∧  b^{320, 2}_0 ∧ true) 
c  in CNF:
c    -b^{320, 2}_2 ∨ -b^{320, 2}_1 ∨ -b^{320, 2}_0 ∨ false 
c  in DIMACS:
-23756 -23757 -23758  0

c i = 3
c  -2+1 --> -1
c    ( b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧  p_960) -> ( b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧  b^{320, 4}_0)
c  in CNF:
c    -b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨  b^{320, 4}_2
c    -b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_1
c    -b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨  b^{320, 4}_0
c  in DIMACS:
-23759 -23760  23761 -960  23762 0
-23759 -23760  23761 -960 -23763 0
-23759 -23760  23761 -960  23764 0

c  -1+1 --> 0
c    ( b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0 ∧  p_960) -> (-b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧ -b^{320, 4}_0)
c  in CNF:
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_2
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_1
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_0
c  in DIMACS:
-23759  23760 -23761 -960 -23762 0
-23759  23760 -23761 -960 -23763 0
-23759  23760 -23761 -960 -23764 0

c  0+1 --> 1
c    (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧  p_960) -> (-b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧  b^{320, 4}_0)
c  in CNF:
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_2
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_1
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨  b^{320, 4}_0
c  in DIMACS:
 23759  23760  23761 -960 -23762 0
 23759  23760  23761 -960 -23763 0
 23759  23760  23761 -960  23764 0

c  1+1 --> 2
c    (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0 ∧  p_960) -> (-b^{320, 4}_2 ∧  b^{320, 4}_1 ∧ -b^{320, 4}_0)
c  in CNF:
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_2
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨  b^{320, 4}_1
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ -p_960 ∨ -b^{320, 4}_0
c  in DIMACS:
 23759  23760 -23761 -960 -23762 0
 23759  23760 -23761 -960  23763 0
 23759  23760 -23761 -960 -23764 0

c  2+1 --> break 
c    (-b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧  p_960) -> break
c  in CNF:
c     b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ -p_960 ∨ break
c  in DIMACS:
 23759 -23760  23761 -960 1162 0


c  2-1 --> 1
c    (-b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧ -p_960) -> (-b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧  b^{320, 4}_0)
c  in CNF:
c     b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_2
c     b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_1
c     b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨  b^{320, 4}_0
c  in DIMACS:
 23759 -23760  23761  960 -23762 0
 23759 -23760  23761  960 -23763 0
 23759 -23760  23761  960  23764 0

c  1-1 --> 0
c    (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0 ∧ -p_960) -> (-b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧ -b^{320, 4}_0)
c  in CNF:
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_2
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_1
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_0
c  in DIMACS:
 23759  23760 -23761  960 -23762 0
 23759  23760 -23761  960 -23763 0
 23759  23760 -23761  960 -23764 0

c  0-1 --> -1
c    (-b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧ -p_960) -> ( b^{320, 4}_2 ∧ -b^{320, 4}_1 ∧  b^{320, 4}_0)
c  in CNF:
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨  b^{320, 4}_2
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_1
c     b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨  b^{320, 4}_0
c  in DIMACS:
 23759  23760  23761  960  23762 0
 23759  23760  23761  960 -23763 0
 23759  23760  23761  960  23764 0

c  -1-1 --> -2
c    ( b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧  b^{320, 3}_0 ∧ -p_960) -> ( b^{320, 4}_2 ∧  b^{320, 4}_1 ∧ -b^{320, 4}_0)
c  in CNF:
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨  b^{320, 4}_2
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨  b^{320, 4}_1
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨  p_960 ∨ -b^{320, 4}_0
c  in DIMACS:
-23759  23760 -23761  960  23762 0
-23759  23760 -23761  960  23763 0
-23759  23760 -23761  960 -23764 0

c  -2-1 --> break 
c    ( b^{320, 3}_2 ∧  b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧ -p_960) -> break
c  in CNF:
c    -b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨  b^{320, 3}_0 ∨  p_960 ∨ break
c  in DIMACS:
-23759 -23760  23761  960 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{320, 3}_2 ∧ -b^{320, 3}_1 ∧ -b^{320, 3}_0 ∧ true) 
c  in CNF:
c    -b^{320, 3}_2 ∨  b^{320, 3}_1 ∨  b^{320, 3}_0 ∨ false 
c  in DIMACS:
-23759  23760  23761  0

c  3 does not represent an automaton state.
c    -(-b^{320, 3}_2 ∧  b^{320, 3}_1 ∧  b^{320, 3}_0 ∧ true) 
c  in CNF:
c     b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ false 
c  in DIMACS:
 23759 -23760 -23761  0
c  -3 does not represent an automaton state.
c    -( b^{320, 3}_2 ∧  b^{320, 3}_1 ∧  b^{320, 3}_0 ∧ true) 
c  in CNF:
c    -b^{320, 3}_2 ∨ -b^{320, 3}_1 ∨ -b^{320, 3}_0 ∨ false 
c  in DIMACS:
-23759 -23760 -23761  0

c INIT for k = 321
c    -b^{321, 1}_2
c    -b^{321, 1}_1
c    -b^{321, 1}_0
c  in DIMACS:
-23765 0
-23766 0
-23767 0

c Transitions for k = 321
c i = 1
c  -2+1 --> -1
c    ( b^{321, 1}_2 ∧  b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧  p_321) -> ( b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0)
c  in CNF:
c    -b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨  b^{321, 2}_2
c    -b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_1
c    -b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨  b^{321, 2}_0
c  in DIMACS:
-23765 -23766  23767 -321  23768 0
-23765 -23766  23767 -321 -23769 0
-23765 -23766  23767 -321  23770 0

c  -1+1 --> 0
c    ( b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧  b^{321, 1}_0 ∧  p_321) -> (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧ -b^{321, 2}_0)
c  in CNF:
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_2
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_1
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_0
c  in DIMACS:
-23765  23766 -23767 -321 -23768 0
-23765  23766 -23767 -321 -23769 0
-23765  23766 -23767 -321 -23770 0

c  0+1 --> 1
c    (-b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧  p_321) -> (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0)
c  in CNF:
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_2
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_1
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨  b^{321, 2}_0
c  in DIMACS:
 23765  23766  23767 -321 -23768 0
 23765  23766  23767 -321 -23769 0
 23765  23766  23767 -321  23770 0

c  1+1 --> 2
c    (-b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧  b^{321, 1}_0 ∧  p_321) -> (-b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0)
c  in CNF:
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_2
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨  b^{321, 2}_1
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ -p_321 ∨ -b^{321, 2}_0
c  in DIMACS:
 23765  23766 -23767 -321 -23768 0
 23765  23766 -23767 -321  23769 0
 23765  23766 -23767 -321 -23770 0

c  2+1 --> break 
c    (-b^{321, 1}_2 ∧  b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧  p_321) -> break
c  in CNF:
c     b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ -p_321 ∨ break
c  in DIMACS:
 23765 -23766  23767 -321 1162 0


c  2-1 --> 1
c    (-b^{321, 1}_2 ∧  b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧ -p_321) -> (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0)
c  in CNF:
c     b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_2
c     b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_1
c     b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨  b^{321, 2}_0
c  in DIMACS:
 23765 -23766  23767  321 -23768 0
 23765 -23766  23767  321 -23769 0
 23765 -23766  23767  321  23770 0

c  1-1 --> 0
c    (-b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧  b^{321, 1}_0 ∧ -p_321) -> (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧ -b^{321, 2}_0)
c  in CNF:
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_2
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_1
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_0
c  in DIMACS:
 23765  23766 -23767  321 -23768 0
 23765  23766 -23767  321 -23769 0
 23765  23766 -23767  321 -23770 0

c  0-1 --> -1
c    (-b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧ -p_321) -> ( b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0)
c  in CNF:
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨  b^{321, 2}_2
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_1
c     b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨  b^{321, 2}_0
c  in DIMACS:
 23765  23766  23767  321  23768 0
 23765  23766  23767  321 -23769 0
 23765  23766  23767  321  23770 0

c  -1-1 --> -2
c    ( b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧  b^{321, 1}_0 ∧ -p_321) -> ( b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0)
c  in CNF:
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨  b^{321, 2}_2
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨  b^{321, 2}_1
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨  p_321 ∨ -b^{321, 2}_0
c  in DIMACS:
-23765  23766 -23767  321  23768 0
-23765  23766 -23767  321  23769 0
-23765  23766 -23767  321 -23770 0

c  -2-1 --> break 
c    ( b^{321, 1}_2 ∧  b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧ -p_321) -> break
c  in CNF:
c    -b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨  b^{321, 1}_0 ∨  p_321 ∨ break
c  in DIMACS:
-23765 -23766  23767  321 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{321, 1}_2 ∧ -b^{321, 1}_1 ∧ -b^{321, 1}_0 ∧ true) 
c  in CNF:
c    -b^{321, 1}_2 ∨  b^{321, 1}_1 ∨  b^{321, 1}_0 ∨ false 
c  in DIMACS:
-23765  23766  23767  0

c  3 does not represent an automaton state.
c    -(-b^{321, 1}_2 ∧  b^{321, 1}_1 ∧  b^{321, 1}_0 ∧ true) 
c  in CNF:
c     b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ false 
c  in DIMACS:
 23765 -23766 -23767  0
c  -3 does not represent an automaton state.
c    -( b^{321, 1}_2 ∧  b^{321, 1}_1 ∧  b^{321, 1}_0 ∧ true) 
c  in CNF:
c    -b^{321, 1}_2 ∨ -b^{321, 1}_1 ∨ -b^{321, 1}_0 ∨ false 
c  in DIMACS:
-23765 -23766 -23767  0

c i = 2
c  -2+1 --> -1
c    ( b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧  p_642) -> ( b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0)
c  in CNF:
c    -b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨  b^{321, 3}_2
c    -b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_1
c    -b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨  b^{321, 3}_0
c  in DIMACS:
-23768 -23769  23770 -642  23771 0
-23768 -23769  23770 -642 -23772 0
-23768 -23769  23770 -642  23773 0

c  -1+1 --> 0
c    ( b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0 ∧  p_642) -> (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧ -b^{321, 3}_0)
c  in CNF:
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_2
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_1
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_0
c  in DIMACS:
-23768  23769 -23770 -642 -23771 0
-23768  23769 -23770 -642 -23772 0
-23768  23769 -23770 -642 -23773 0

c  0+1 --> 1
c    (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧  p_642) -> (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0)
c  in CNF:
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_2
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_1
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨  b^{321, 3}_0
c  in DIMACS:
 23768  23769  23770 -642 -23771 0
 23768  23769  23770 -642 -23772 0
 23768  23769  23770 -642  23773 0

c  1+1 --> 2
c    (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0 ∧  p_642) -> (-b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0)
c  in CNF:
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_2
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨  b^{321, 3}_1
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ -p_642 ∨ -b^{321, 3}_0
c  in DIMACS:
 23768  23769 -23770 -642 -23771 0
 23768  23769 -23770 -642  23772 0
 23768  23769 -23770 -642 -23773 0

c  2+1 --> break 
c    (-b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧  p_642) -> break
c  in CNF:
c     b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ -p_642 ∨ break
c  in DIMACS:
 23768 -23769  23770 -642 1162 0


c  2-1 --> 1
c    (-b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧ -p_642) -> (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0)
c  in CNF:
c     b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_2
c     b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_1
c     b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨  b^{321, 3}_0
c  in DIMACS:
 23768 -23769  23770  642 -23771 0
 23768 -23769  23770  642 -23772 0
 23768 -23769  23770  642  23773 0

c  1-1 --> 0
c    (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0 ∧ -p_642) -> (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧ -b^{321, 3}_0)
c  in CNF:
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_2
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_1
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_0
c  in DIMACS:
 23768  23769 -23770  642 -23771 0
 23768  23769 -23770  642 -23772 0
 23768  23769 -23770  642 -23773 0

c  0-1 --> -1
c    (-b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧ -p_642) -> ( b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0)
c  in CNF:
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨  b^{321, 3}_2
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_1
c     b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨  b^{321, 3}_0
c  in DIMACS:
 23768  23769  23770  642  23771 0
 23768  23769  23770  642 -23772 0
 23768  23769  23770  642  23773 0

c  -1-1 --> -2
c    ( b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧  b^{321, 2}_0 ∧ -p_642) -> ( b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0)
c  in CNF:
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨  b^{321, 3}_2
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨  b^{321, 3}_1
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨  p_642 ∨ -b^{321, 3}_0
c  in DIMACS:
-23768  23769 -23770  642  23771 0
-23768  23769 -23770  642  23772 0
-23768  23769 -23770  642 -23773 0

c  -2-1 --> break 
c    ( b^{321, 2}_2 ∧  b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧ -p_642) -> break
c  in CNF:
c    -b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨  b^{321, 2}_0 ∨  p_642 ∨ break
c  in DIMACS:
-23768 -23769  23770  642 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{321, 2}_2 ∧ -b^{321, 2}_1 ∧ -b^{321, 2}_0 ∧ true) 
c  in CNF:
c    -b^{321, 2}_2 ∨  b^{321, 2}_1 ∨  b^{321, 2}_0 ∨ false 
c  in DIMACS:
-23768  23769  23770  0

c  3 does not represent an automaton state.
c    -(-b^{321, 2}_2 ∧  b^{321, 2}_1 ∧  b^{321, 2}_0 ∧ true) 
c  in CNF:
c     b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ false 
c  in DIMACS:
 23768 -23769 -23770  0
c  -3 does not represent an automaton state.
c    -( b^{321, 2}_2 ∧  b^{321, 2}_1 ∧  b^{321, 2}_0 ∧ true) 
c  in CNF:
c    -b^{321, 2}_2 ∨ -b^{321, 2}_1 ∨ -b^{321, 2}_0 ∨ false 
c  in DIMACS:
-23768 -23769 -23770  0

c i = 3
c  -2+1 --> -1
c    ( b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧  p_963) -> ( b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧  b^{321, 4}_0)
c  in CNF:
c    -b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨  b^{321, 4}_2
c    -b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_1
c    -b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨  b^{321, 4}_0
c  in DIMACS:
-23771 -23772  23773 -963  23774 0
-23771 -23772  23773 -963 -23775 0
-23771 -23772  23773 -963  23776 0

c  -1+1 --> 0
c    ( b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0 ∧  p_963) -> (-b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧ -b^{321, 4}_0)
c  in CNF:
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_2
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_1
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_0
c  in DIMACS:
-23771  23772 -23773 -963 -23774 0
-23771  23772 -23773 -963 -23775 0
-23771  23772 -23773 -963 -23776 0

c  0+1 --> 1
c    (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧  p_963) -> (-b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧  b^{321, 4}_0)
c  in CNF:
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_2
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_1
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨  b^{321, 4}_0
c  in DIMACS:
 23771  23772  23773 -963 -23774 0
 23771  23772  23773 -963 -23775 0
 23771  23772  23773 -963  23776 0

c  1+1 --> 2
c    (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0 ∧  p_963) -> (-b^{321, 4}_2 ∧  b^{321, 4}_1 ∧ -b^{321, 4}_0)
c  in CNF:
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_2
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨  b^{321, 4}_1
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ -p_963 ∨ -b^{321, 4}_0
c  in DIMACS:
 23771  23772 -23773 -963 -23774 0
 23771  23772 -23773 -963  23775 0
 23771  23772 -23773 -963 -23776 0

c  2+1 --> break 
c    (-b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧  p_963) -> break
c  in CNF:
c     b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ -p_963 ∨ break
c  in DIMACS:
 23771 -23772  23773 -963 1162 0


c  2-1 --> 1
c    (-b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧ -p_963) -> (-b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧  b^{321, 4}_0)
c  in CNF:
c     b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_2
c     b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_1
c     b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨  b^{321, 4}_0
c  in DIMACS:
 23771 -23772  23773  963 -23774 0
 23771 -23772  23773  963 -23775 0
 23771 -23772  23773  963  23776 0

c  1-1 --> 0
c    (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0 ∧ -p_963) -> (-b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧ -b^{321, 4}_0)
c  in CNF:
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_2
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_1
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_0
c  in DIMACS:
 23771  23772 -23773  963 -23774 0
 23771  23772 -23773  963 -23775 0
 23771  23772 -23773  963 -23776 0

c  0-1 --> -1
c    (-b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧ -p_963) -> ( b^{321, 4}_2 ∧ -b^{321, 4}_1 ∧  b^{321, 4}_0)
c  in CNF:
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨  b^{321, 4}_2
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_1
c     b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨  b^{321, 4}_0
c  in DIMACS:
 23771  23772  23773  963  23774 0
 23771  23772  23773  963 -23775 0
 23771  23772  23773  963  23776 0

c  -1-1 --> -2
c    ( b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧  b^{321, 3}_0 ∧ -p_963) -> ( b^{321, 4}_2 ∧  b^{321, 4}_1 ∧ -b^{321, 4}_0)
c  in CNF:
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨  b^{321, 4}_2
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨  b^{321, 4}_1
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨  p_963 ∨ -b^{321, 4}_0
c  in DIMACS:
-23771  23772 -23773  963  23774 0
-23771  23772 -23773  963  23775 0
-23771  23772 -23773  963 -23776 0

c  -2-1 --> break 
c    ( b^{321, 3}_2 ∧  b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧ -p_963) -> break
c  in CNF:
c    -b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨  b^{321, 3}_0 ∨  p_963 ∨ break
c  in DIMACS:
-23771 -23772  23773  963 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{321, 3}_2 ∧ -b^{321, 3}_1 ∧ -b^{321, 3}_0 ∧ true) 
c  in CNF:
c    -b^{321, 3}_2 ∨  b^{321, 3}_1 ∨  b^{321, 3}_0 ∨ false 
c  in DIMACS:
-23771  23772  23773  0

c  3 does not represent an automaton state.
c    -(-b^{321, 3}_2 ∧  b^{321, 3}_1 ∧  b^{321, 3}_0 ∧ true) 
c  in CNF:
c     b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ false 
c  in DIMACS:
 23771 -23772 -23773  0
c  -3 does not represent an automaton state.
c    -( b^{321, 3}_2 ∧  b^{321, 3}_1 ∧  b^{321, 3}_0 ∧ true) 
c  in CNF:
c    -b^{321, 3}_2 ∨ -b^{321, 3}_1 ∨ -b^{321, 3}_0 ∨ false 
c  in DIMACS:
-23771 -23772 -23773  0

c INIT for k = 322
c    -b^{322, 1}_2
c    -b^{322, 1}_1
c    -b^{322, 1}_0
c  in DIMACS:
-23777 0
-23778 0
-23779 0

c Transitions for k = 322
c i = 1
c  -2+1 --> -1
c    ( b^{322, 1}_2 ∧  b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧  p_322) -> ( b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0)
c  in CNF:
c    -b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨  b^{322, 2}_2
c    -b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_1
c    -b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨  b^{322, 2}_0
c  in DIMACS:
-23777 -23778  23779 -322  23780 0
-23777 -23778  23779 -322 -23781 0
-23777 -23778  23779 -322  23782 0

c  -1+1 --> 0
c    ( b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧  b^{322, 1}_0 ∧  p_322) -> (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧ -b^{322, 2}_0)
c  in CNF:
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_2
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_1
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_0
c  in DIMACS:
-23777  23778 -23779 -322 -23780 0
-23777  23778 -23779 -322 -23781 0
-23777  23778 -23779 -322 -23782 0

c  0+1 --> 1
c    (-b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧  p_322) -> (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0)
c  in CNF:
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_2
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_1
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨  b^{322, 2}_0
c  in DIMACS:
 23777  23778  23779 -322 -23780 0
 23777  23778  23779 -322 -23781 0
 23777  23778  23779 -322  23782 0

c  1+1 --> 2
c    (-b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧  b^{322, 1}_0 ∧  p_322) -> (-b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0)
c  in CNF:
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_2
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨  b^{322, 2}_1
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ -p_322 ∨ -b^{322, 2}_0
c  in DIMACS:
 23777  23778 -23779 -322 -23780 0
 23777  23778 -23779 -322  23781 0
 23777  23778 -23779 -322 -23782 0

c  2+1 --> break 
c    (-b^{322, 1}_2 ∧  b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧  p_322) -> break
c  in CNF:
c     b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ -p_322 ∨ break
c  in DIMACS:
 23777 -23778  23779 -322 1162 0


c  2-1 --> 1
c    (-b^{322, 1}_2 ∧  b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧ -p_322) -> (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0)
c  in CNF:
c     b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_2
c     b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_1
c     b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨  b^{322, 2}_0
c  in DIMACS:
 23777 -23778  23779  322 -23780 0
 23777 -23778  23779  322 -23781 0
 23777 -23778  23779  322  23782 0

c  1-1 --> 0
c    (-b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧  b^{322, 1}_0 ∧ -p_322) -> (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧ -b^{322, 2}_0)
c  in CNF:
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_2
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_1
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_0
c  in DIMACS:
 23777  23778 -23779  322 -23780 0
 23777  23778 -23779  322 -23781 0
 23777  23778 -23779  322 -23782 0

c  0-1 --> -1
c    (-b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧ -p_322) -> ( b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0)
c  in CNF:
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨  b^{322, 2}_2
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_1
c     b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨  b^{322, 2}_0
c  in DIMACS:
 23777  23778  23779  322  23780 0
 23777  23778  23779  322 -23781 0
 23777  23778  23779  322  23782 0

c  -1-1 --> -2
c    ( b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧  b^{322, 1}_0 ∧ -p_322) -> ( b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0)
c  in CNF:
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨  b^{322, 2}_2
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨  b^{322, 2}_1
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨  p_322 ∨ -b^{322, 2}_0
c  in DIMACS:
-23777  23778 -23779  322  23780 0
-23777  23778 -23779  322  23781 0
-23777  23778 -23779  322 -23782 0

c  -2-1 --> break 
c    ( b^{322, 1}_2 ∧  b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧ -p_322) -> break
c  in CNF:
c    -b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨  b^{322, 1}_0 ∨  p_322 ∨ break
c  in DIMACS:
-23777 -23778  23779  322 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{322, 1}_2 ∧ -b^{322, 1}_1 ∧ -b^{322, 1}_0 ∧ true) 
c  in CNF:
c    -b^{322, 1}_2 ∨  b^{322, 1}_1 ∨  b^{322, 1}_0 ∨ false 
c  in DIMACS:
-23777  23778  23779  0

c  3 does not represent an automaton state.
c    -(-b^{322, 1}_2 ∧  b^{322, 1}_1 ∧  b^{322, 1}_0 ∧ true) 
c  in CNF:
c     b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ false 
c  in DIMACS:
 23777 -23778 -23779  0
c  -3 does not represent an automaton state.
c    -( b^{322, 1}_2 ∧  b^{322, 1}_1 ∧  b^{322, 1}_0 ∧ true) 
c  in CNF:
c    -b^{322, 1}_2 ∨ -b^{322, 1}_1 ∨ -b^{322, 1}_0 ∨ false 
c  in DIMACS:
-23777 -23778 -23779  0

c i = 2
c  -2+1 --> -1
c    ( b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧  p_644) -> ( b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0)
c  in CNF:
c    -b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨  b^{322, 3}_2
c    -b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_1
c    -b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨  b^{322, 3}_0
c  in DIMACS:
-23780 -23781  23782 -644  23783 0
-23780 -23781  23782 -644 -23784 0
-23780 -23781  23782 -644  23785 0

c  -1+1 --> 0
c    ( b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0 ∧  p_644) -> (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧ -b^{322, 3}_0)
c  in CNF:
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_2
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_1
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_0
c  in DIMACS:
-23780  23781 -23782 -644 -23783 0
-23780  23781 -23782 -644 -23784 0
-23780  23781 -23782 -644 -23785 0

c  0+1 --> 1
c    (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧  p_644) -> (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0)
c  in CNF:
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_2
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_1
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨  b^{322, 3}_0
c  in DIMACS:
 23780  23781  23782 -644 -23783 0
 23780  23781  23782 -644 -23784 0
 23780  23781  23782 -644  23785 0

c  1+1 --> 2
c    (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0 ∧  p_644) -> (-b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0)
c  in CNF:
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_2
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨  b^{322, 3}_1
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ -p_644 ∨ -b^{322, 3}_0
c  in DIMACS:
 23780  23781 -23782 -644 -23783 0
 23780  23781 -23782 -644  23784 0
 23780  23781 -23782 -644 -23785 0

c  2+1 --> break 
c    (-b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧  p_644) -> break
c  in CNF:
c     b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ -p_644 ∨ break
c  in DIMACS:
 23780 -23781  23782 -644 1162 0


c  2-1 --> 1
c    (-b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧ -p_644) -> (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0)
c  in CNF:
c     b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_2
c     b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_1
c     b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨  b^{322, 3}_0
c  in DIMACS:
 23780 -23781  23782  644 -23783 0
 23780 -23781  23782  644 -23784 0
 23780 -23781  23782  644  23785 0

c  1-1 --> 0
c    (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0 ∧ -p_644) -> (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧ -b^{322, 3}_0)
c  in CNF:
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_2
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_1
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_0
c  in DIMACS:
 23780  23781 -23782  644 -23783 0
 23780  23781 -23782  644 -23784 0
 23780  23781 -23782  644 -23785 0

c  0-1 --> -1
c    (-b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧ -p_644) -> ( b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0)
c  in CNF:
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨  b^{322, 3}_2
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_1
c     b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨  b^{322, 3}_0
c  in DIMACS:
 23780  23781  23782  644  23783 0
 23780  23781  23782  644 -23784 0
 23780  23781  23782  644  23785 0

c  -1-1 --> -2
c    ( b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧  b^{322, 2}_0 ∧ -p_644) -> ( b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0)
c  in CNF:
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨  b^{322, 3}_2
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨  b^{322, 3}_1
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨  p_644 ∨ -b^{322, 3}_0
c  in DIMACS:
-23780  23781 -23782  644  23783 0
-23780  23781 -23782  644  23784 0
-23780  23781 -23782  644 -23785 0

c  -2-1 --> break 
c    ( b^{322, 2}_2 ∧  b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧ -p_644) -> break
c  in CNF:
c    -b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨  b^{322, 2}_0 ∨  p_644 ∨ break
c  in DIMACS:
-23780 -23781  23782  644 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{322, 2}_2 ∧ -b^{322, 2}_1 ∧ -b^{322, 2}_0 ∧ true) 
c  in CNF:
c    -b^{322, 2}_2 ∨  b^{322, 2}_1 ∨  b^{322, 2}_0 ∨ false 
c  in DIMACS:
-23780  23781  23782  0

c  3 does not represent an automaton state.
c    -(-b^{322, 2}_2 ∧  b^{322, 2}_1 ∧  b^{322, 2}_0 ∧ true) 
c  in CNF:
c     b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ false 
c  in DIMACS:
 23780 -23781 -23782  0
c  -3 does not represent an automaton state.
c    -( b^{322, 2}_2 ∧  b^{322, 2}_1 ∧  b^{322, 2}_0 ∧ true) 
c  in CNF:
c    -b^{322, 2}_2 ∨ -b^{322, 2}_1 ∨ -b^{322, 2}_0 ∨ false 
c  in DIMACS:
-23780 -23781 -23782  0

c i = 3
c  -2+1 --> -1
c    ( b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧  p_966) -> ( b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧  b^{322, 4}_0)
c  in CNF:
c    -b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨  b^{322, 4}_2
c    -b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_1
c    -b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨  b^{322, 4}_0
c  in DIMACS:
-23783 -23784  23785 -966  23786 0
-23783 -23784  23785 -966 -23787 0
-23783 -23784  23785 -966  23788 0

c  -1+1 --> 0
c    ( b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0 ∧  p_966) -> (-b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧ -b^{322, 4}_0)
c  in CNF:
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_2
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_1
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_0
c  in DIMACS:
-23783  23784 -23785 -966 -23786 0
-23783  23784 -23785 -966 -23787 0
-23783  23784 -23785 -966 -23788 0

c  0+1 --> 1
c    (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧  p_966) -> (-b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧  b^{322, 4}_0)
c  in CNF:
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_2
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_1
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨  b^{322, 4}_0
c  in DIMACS:
 23783  23784  23785 -966 -23786 0
 23783  23784  23785 -966 -23787 0
 23783  23784  23785 -966  23788 0

c  1+1 --> 2
c    (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0 ∧  p_966) -> (-b^{322, 4}_2 ∧  b^{322, 4}_1 ∧ -b^{322, 4}_0)
c  in CNF:
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_2
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨  b^{322, 4}_1
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ -p_966 ∨ -b^{322, 4}_0
c  in DIMACS:
 23783  23784 -23785 -966 -23786 0
 23783  23784 -23785 -966  23787 0
 23783  23784 -23785 -966 -23788 0

c  2+1 --> break 
c    (-b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧  p_966) -> break
c  in CNF:
c     b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ -p_966 ∨ break
c  in DIMACS:
 23783 -23784  23785 -966 1162 0


c  2-1 --> 1
c    (-b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧ -p_966) -> (-b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧  b^{322, 4}_0)
c  in CNF:
c     b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_2
c     b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_1
c     b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨  b^{322, 4}_0
c  in DIMACS:
 23783 -23784  23785  966 -23786 0
 23783 -23784  23785  966 -23787 0
 23783 -23784  23785  966  23788 0

c  1-1 --> 0
c    (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0 ∧ -p_966) -> (-b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧ -b^{322, 4}_0)
c  in CNF:
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_2
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_1
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_0
c  in DIMACS:
 23783  23784 -23785  966 -23786 0
 23783  23784 -23785  966 -23787 0
 23783  23784 -23785  966 -23788 0

c  0-1 --> -1
c    (-b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧ -p_966) -> ( b^{322, 4}_2 ∧ -b^{322, 4}_1 ∧  b^{322, 4}_0)
c  in CNF:
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨  b^{322, 4}_2
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_1
c     b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨  b^{322, 4}_0
c  in DIMACS:
 23783  23784  23785  966  23786 0
 23783  23784  23785  966 -23787 0
 23783  23784  23785  966  23788 0

c  -1-1 --> -2
c    ( b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧  b^{322, 3}_0 ∧ -p_966) -> ( b^{322, 4}_2 ∧  b^{322, 4}_1 ∧ -b^{322, 4}_0)
c  in CNF:
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨  b^{322, 4}_2
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨  b^{322, 4}_1
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨  p_966 ∨ -b^{322, 4}_0
c  in DIMACS:
-23783  23784 -23785  966  23786 0
-23783  23784 -23785  966  23787 0
-23783  23784 -23785  966 -23788 0

c  -2-1 --> break 
c    ( b^{322, 3}_2 ∧  b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧ -p_966) -> break
c  in CNF:
c    -b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨  b^{322, 3}_0 ∨  p_966 ∨ break
c  in DIMACS:
-23783 -23784  23785  966 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{322, 3}_2 ∧ -b^{322, 3}_1 ∧ -b^{322, 3}_0 ∧ true) 
c  in CNF:
c    -b^{322, 3}_2 ∨  b^{322, 3}_1 ∨  b^{322, 3}_0 ∨ false 
c  in DIMACS:
-23783  23784  23785  0

c  3 does not represent an automaton state.
c    -(-b^{322, 3}_2 ∧  b^{322, 3}_1 ∧  b^{322, 3}_0 ∧ true) 
c  in CNF:
c     b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ false 
c  in DIMACS:
 23783 -23784 -23785  0
c  -3 does not represent an automaton state.
c    -( b^{322, 3}_2 ∧  b^{322, 3}_1 ∧  b^{322, 3}_0 ∧ true) 
c  in CNF:
c    -b^{322, 3}_2 ∨ -b^{322, 3}_1 ∨ -b^{322, 3}_0 ∨ false 
c  in DIMACS:
-23783 -23784 -23785  0

c INIT for k = 323
c    -b^{323, 1}_2
c    -b^{323, 1}_1
c    -b^{323, 1}_0
c  in DIMACS:
-23789 0
-23790 0
-23791 0

c Transitions for k = 323
c i = 1
c  -2+1 --> -1
c    ( b^{323, 1}_2 ∧  b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧  p_323) -> ( b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0)
c  in CNF:
c    -b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨  b^{323, 2}_2
c    -b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_1
c    -b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨  b^{323, 2}_0
c  in DIMACS:
-23789 -23790  23791 -323  23792 0
-23789 -23790  23791 -323 -23793 0
-23789 -23790  23791 -323  23794 0

c  -1+1 --> 0
c    ( b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧  b^{323, 1}_0 ∧  p_323) -> (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧ -b^{323, 2}_0)
c  in CNF:
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_2
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_1
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_0
c  in DIMACS:
-23789  23790 -23791 -323 -23792 0
-23789  23790 -23791 -323 -23793 0
-23789  23790 -23791 -323 -23794 0

c  0+1 --> 1
c    (-b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧  p_323) -> (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0)
c  in CNF:
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_2
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_1
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨  b^{323, 2}_0
c  in DIMACS:
 23789  23790  23791 -323 -23792 0
 23789  23790  23791 -323 -23793 0
 23789  23790  23791 -323  23794 0

c  1+1 --> 2
c    (-b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧  b^{323, 1}_0 ∧  p_323) -> (-b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0)
c  in CNF:
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_2
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨  b^{323, 2}_1
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ -p_323 ∨ -b^{323, 2}_0
c  in DIMACS:
 23789  23790 -23791 -323 -23792 0
 23789  23790 -23791 -323  23793 0
 23789  23790 -23791 -323 -23794 0

c  2+1 --> break 
c    (-b^{323, 1}_2 ∧  b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧  p_323) -> break
c  in CNF:
c     b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ -p_323 ∨ break
c  in DIMACS:
 23789 -23790  23791 -323 1162 0


c  2-1 --> 1
c    (-b^{323, 1}_2 ∧  b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧ -p_323) -> (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0)
c  in CNF:
c     b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_2
c     b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_1
c     b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨  b^{323, 2}_0
c  in DIMACS:
 23789 -23790  23791  323 -23792 0
 23789 -23790  23791  323 -23793 0
 23789 -23790  23791  323  23794 0

c  1-1 --> 0
c    (-b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧  b^{323, 1}_0 ∧ -p_323) -> (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧ -b^{323, 2}_0)
c  in CNF:
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_2
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_1
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_0
c  in DIMACS:
 23789  23790 -23791  323 -23792 0
 23789  23790 -23791  323 -23793 0
 23789  23790 -23791  323 -23794 0

c  0-1 --> -1
c    (-b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧ -p_323) -> ( b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0)
c  in CNF:
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨  b^{323, 2}_2
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_1
c     b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨  b^{323, 2}_0
c  in DIMACS:
 23789  23790  23791  323  23792 0
 23789  23790  23791  323 -23793 0
 23789  23790  23791  323  23794 0

c  -1-1 --> -2
c    ( b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧  b^{323, 1}_0 ∧ -p_323) -> ( b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0)
c  in CNF:
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨  b^{323, 2}_2
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨  b^{323, 2}_1
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨  p_323 ∨ -b^{323, 2}_0
c  in DIMACS:
-23789  23790 -23791  323  23792 0
-23789  23790 -23791  323  23793 0
-23789  23790 -23791  323 -23794 0

c  -2-1 --> break 
c    ( b^{323, 1}_2 ∧  b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧ -p_323) -> break
c  in CNF:
c    -b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨  b^{323, 1}_0 ∨  p_323 ∨ break
c  in DIMACS:
-23789 -23790  23791  323 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{323, 1}_2 ∧ -b^{323, 1}_1 ∧ -b^{323, 1}_0 ∧ true) 
c  in CNF:
c    -b^{323, 1}_2 ∨  b^{323, 1}_1 ∨  b^{323, 1}_0 ∨ false 
c  in DIMACS:
-23789  23790  23791  0

c  3 does not represent an automaton state.
c    -(-b^{323, 1}_2 ∧  b^{323, 1}_1 ∧  b^{323, 1}_0 ∧ true) 
c  in CNF:
c     b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ false 
c  in DIMACS:
 23789 -23790 -23791  0
c  -3 does not represent an automaton state.
c    -( b^{323, 1}_2 ∧  b^{323, 1}_1 ∧  b^{323, 1}_0 ∧ true) 
c  in CNF:
c    -b^{323, 1}_2 ∨ -b^{323, 1}_1 ∨ -b^{323, 1}_0 ∨ false 
c  in DIMACS:
-23789 -23790 -23791  0

c i = 2
c  -2+1 --> -1
c    ( b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧  p_646) -> ( b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0)
c  in CNF:
c    -b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨  b^{323, 3}_2
c    -b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_1
c    -b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨  b^{323, 3}_0
c  in DIMACS:
-23792 -23793  23794 -646  23795 0
-23792 -23793  23794 -646 -23796 0
-23792 -23793  23794 -646  23797 0

c  -1+1 --> 0
c    ( b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0 ∧  p_646) -> (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧ -b^{323, 3}_0)
c  in CNF:
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_2
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_1
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_0
c  in DIMACS:
-23792  23793 -23794 -646 -23795 0
-23792  23793 -23794 -646 -23796 0
-23792  23793 -23794 -646 -23797 0

c  0+1 --> 1
c    (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧  p_646) -> (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0)
c  in CNF:
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_2
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_1
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨  b^{323, 3}_0
c  in DIMACS:
 23792  23793  23794 -646 -23795 0
 23792  23793  23794 -646 -23796 0
 23792  23793  23794 -646  23797 0

c  1+1 --> 2
c    (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0 ∧  p_646) -> (-b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0)
c  in CNF:
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_2
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨  b^{323, 3}_1
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ -p_646 ∨ -b^{323, 3}_0
c  in DIMACS:
 23792  23793 -23794 -646 -23795 0
 23792  23793 -23794 -646  23796 0
 23792  23793 -23794 -646 -23797 0

c  2+1 --> break 
c    (-b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧  p_646) -> break
c  in CNF:
c     b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ -p_646 ∨ break
c  in DIMACS:
 23792 -23793  23794 -646 1162 0


c  2-1 --> 1
c    (-b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧ -p_646) -> (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0)
c  in CNF:
c     b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_2
c     b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_1
c     b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨  b^{323, 3}_0
c  in DIMACS:
 23792 -23793  23794  646 -23795 0
 23792 -23793  23794  646 -23796 0
 23792 -23793  23794  646  23797 0

c  1-1 --> 0
c    (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0 ∧ -p_646) -> (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧ -b^{323, 3}_0)
c  in CNF:
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_2
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_1
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_0
c  in DIMACS:
 23792  23793 -23794  646 -23795 0
 23792  23793 -23794  646 -23796 0
 23792  23793 -23794  646 -23797 0

c  0-1 --> -1
c    (-b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧ -p_646) -> ( b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0)
c  in CNF:
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨  b^{323, 3}_2
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_1
c     b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨  b^{323, 3}_0
c  in DIMACS:
 23792  23793  23794  646  23795 0
 23792  23793  23794  646 -23796 0
 23792  23793  23794  646  23797 0

c  -1-1 --> -2
c    ( b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧  b^{323, 2}_0 ∧ -p_646) -> ( b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0)
c  in CNF:
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨  b^{323, 3}_2
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨  b^{323, 3}_1
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨  p_646 ∨ -b^{323, 3}_0
c  in DIMACS:
-23792  23793 -23794  646  23795 0
-23792  23793 -23794  646  23796 0
-23792  23793 -23794  646 -23797 0

c  -2-1 --> break 
c    ( b^{323, 2}_2 ∧  b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧ -p_646) -> break
c  in CNF:
c    -b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨  b^{323, 2}_0 ∨  p_646 ∨ break
c  in DIMACS:
-23792 -23793  23794  646 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{323, 2}_2 ∧ -b^{323, 2}_1 ∧ -b^{323, 2}_0 ∧ true) 
c  in CNF:
c    -b^{323, 2}_2 ∨  b^{323, 2}_1 ∨  b^{323, 2}_0 ∨ false 
c  in DIMACS:
-23792  23793  23794  0

c  3 does not represent an automaton state.
c    -(-b^{323, 2}_2 ∧  b^{323, 2}_1 ∧  b^{323, 2}_0 ∧ true) 
c  in CNF:
c     b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ false 
c  in DIMACS:
 23792 -23793 -23794  0
c  -3 does not represent an automaton state.
c    -( b^{323, 2}_2 ∧  b^{323, 2}_1 ∧  b^{323, 2}_0 ∧ true) 
c  in CNF:
c    -b^{323, 2}_2 ∨ -b^{323, 2}_1 ∨ -b^{323, 2}_0 ∨ false 
c  in DIMACS:
-23792 -23793 -23794  0

c i = 3
c  -2+1 --> -1
c    ( b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧  p_969) -> ( b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧  b^{323, 4}_0)
c  in CNF:
c    -b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨  b^{323, 4}_2
c    -b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_1
c    -b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨  b^{323, 4}_0
c  in DIMACS:
-23795 -23796  23797 -969  23798 0
-23795 -23796  23797 -969 -23799 0
-23795 -23796  23797 -969  23800 0

c  -1+1 --> 0
c    ( b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0 ∧  p_969) -> (-b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧ -b^{323, 4}_0)
c  in CNF:
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_2
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_1
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_0
c  in DIMACS:
-23795  23796 -23797 -969 -23798 0
-23795  23796 -23797 -969 -23799 0
-23795  23796 -23797 -969 -23800 0

c  0+1 --> 1
c    (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧  p_969) -> (-b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧  b^{323, 4}_0)
c  in CNF:
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_2
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_1
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨  b^{323, 4}_0
c  in DIMACS:
 23795  23796  23797 -969 -23798 0
 23795  23796  23797 -969 -23799 0
 23795  23796  23797 -969  23800 0

c  1+1 --> 2
c    (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0 ∧  p_969) -> (-b^{323, 4}_2 ∧  b^{323, 4}_1 ∧ -b^{323, 4}_0)
c  in CNF:
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_2
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨  b^{323, 4}_1
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ -p_969 ∨ -b^{323, 4}_0
c  in DIMACS:
 23795  23796 -23797 -969 -23798 0
 23795  23796 -23797 -969  23799 0
 23795  23796 -23797 -969 -23800 0

c  2+1 --> break 
c    (-b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧  p_969) -> break
c  in CNF:
c     b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ -p_969 ∨ break
c  in DIMACS:
 23795 -23796  23797 -969 1162 0


c  2-1 --> 1
c    (-b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧ -p_969) -> (-b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧  b^{323, 4}_0)
c  in CNF:
c     b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_2
c     b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_1
c     b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨  b^{323, 4}_0
c  in DIMACS:
 23795 -23796  23797  969 -23798 0
 23795 -23796  23797  969 -23799 0
 23795 -23796  23797  969  23800 0

c  1-1 --> 0
c    (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0 ∧ -p_969) -> (-b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧ -b^{323, 4}_0)
c  in CNF:
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_2
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_1
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_0
c  in DIMACS:
 23795  23796 -23797  969 -23798 0
 23795  23796 -23797  969 -23799 0
 23795  23796 -23797  969 -23800 0

c  0-1 --> -1
c    (-b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧ -p_969) -> ( b^{323, 4}_2 ∧ -b^{323, 4}_1 ∧  b^{323, 4}_0)
c  in CNF:
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨  b^{323, 4}_2
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_1
c     b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨  b^{323, 4}_0
c  in DIMACS:
 23795  23796  23797  969  23798 0
 23795  23796  23797  969 -23799 0
 23795  23796  23797  969  23800 0

c  -1-1 --> -2
c    ( b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧  b^{323, 3}_0 ∧ -p_969) -> ( b^{323, 4}_2 ∧  b^{323, 4}_1 ∧ -b^{323, 4}_0)
c  in CNF:
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨  b^{323, 4}_2
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨  b^{323, 4}_1
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨  p_969 ∨ -b^{323, 4}_0
c  in DIMACS:
-23795  23796 -23797  969  23798 0
-23795  23796 -23797  969  23799 0
-23795  23796 -23797  969 -23800 0

c  -2-1 --> break 
c    ( b^{323, 3}_2 ∧  b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧ -p_969) -> break
c  in CNF:
c    -b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨  b^{323, 3}_0 ∨  p_969 ∨ break
c  in DIMACS:
-23795 -23796  23797  969 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{323, 3}_2 ∧ -b^{323, 3}_1 ∧ -b^{323, 3}_0 ∧ true) 
c  in CNF:
c    -b^{323, 3}_2 ∨  b^{323, 3}_1 ∨  b^{323, 3}_0 ∨ false 
c  in DIMACS:
-23795  23796  23797  0

c  3 does not represent an automaton state.
c    -(-b^{323, 3}_2 ∧  b^{323, 3}_1 ∧  b^{323, 3}_0 ∧ true) 
c  in CNF:
c     b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ false 
c  in DIMACS:
 23795 -23796 -23797  0
c  -3 does not represent an automaton state.
c    -( b^{323, 3}_2 ∧  b^{323, 3}_1 ∧  b^{323, 3}_0 ∧ true) 
c  in CNF:
c    -b^{323, 3}_2 ∨ -b^{323, 3}_1 ∨ -b^{323, 3}_0 ∨ false 
c  in DIMACS:
-23795 -23796 -23797  0

c INIT for k = 324
c    -b^{324, 1}_2
c    -b^{324, 1}_1
c    -b^{324, 1}_0
c  in DIMACS:
-23801 0
-23802 0
-23803 0

c Transitions for k = 324
c i = 1
c  -2+1 --> -1
c    ( b^{324, 1}_2 ∧  b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧  p_324) -> ( b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0)
c  in CNF:
c    -b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨  b^{324, 2}_2
c    -b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_1
c    -b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨  b^{324, 2}_0
c  in DIMACS:
-23801 -23802  23803 -324  23804 0
-23801 -23802  23803 -324 -23805 0
-23801 -23802  23803 -324  23806 0

c  -1+1 --> 0
c    ( b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧  b^{324, 1}_0 ∧  p_324) -> (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧ -b^{324, 2}_0)
c  in CNF:
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_2
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_1
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_0
c  in DIMACS:
-23801  23802 -23803 -324 -23804 0
-23801  23802 -23803 -324 -23805 0
-23801  23802 -23803 -324 -23806 0

c  0+1 --> 1
c    (-b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧  p_324) -> (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0)
c  in CNF:
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_2
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_1
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨  b^{324, 2}_0
c  in DIMACS:
 23801  23802  23803 -324 -23804 0
 23801  23802  23803 -324 -23805 0
 23801  23802  23803 -324  23806 0

c  1+1 --> 2
c    (-b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧  b^{324, 1}_0 ∧  p_324) -> (-b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0)
c  in CNF:
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_2
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨  b^{324, 2}_1
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ -p_324 ∨ -b^{324, 2}_0
c  in DIMACS:
 23801  23802 -23803 -324 -23804 0
 23801  23802 -23803 -324  23805 0
 23801  23802 -23803 -324 -23806 0

c  2+1 --> break 
c    (-b^{324, 1}_2 ∧  b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧  p_324) -> break
c  in CNF:
c     b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ -p_324 ∨ break
c  in DIMACS:
 23801 -23802  23803 -324 1162 0


c  2-1 --> 1
c    (-b^{324, 1}_2 ∧  b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧ -p_324) -> (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0)
c  in CNF:
c     b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_2
c     b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_1
c     b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨  b^{324, 2}_0
c  in DIMACS:
 23801 -23802  23803  324 -23804 0
 23801 -23802  23803  324 -23805 0
 23801 -23802  23803  324  23806 0

c  1-1 --> 0
c    (-b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧  b^{324, 1}_0 ∧ -p_324) -> (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧ -b^{324, 2}_0)
c  in CNF:
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_2
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_1
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_0
c  in DIMACS:
 23801  23802 -23803  324 -23804 0
 23801  23802 -23803  324 -23805 0
 23801  23802 -23803  324 -23806 0

c  0-1 --> -1
c    (-b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧ -p_324) -> ( b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0)
c  in CNF:
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨  b^{324, 2}_2
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_1
c     b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨  b^{324, 2}_0
c  in DIMACS:
 23801  23802  23803  324  23804 0
 23801  23802  23803  324 -23805 0
 23801  23802  23803  324  23806 0

c  -1-1 --> -2
c    ( b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧  b^{324, 1}_0 ∧ -p_324) -> ( b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0)
c  in CNF:
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨  b^{324, 2}_2
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨  b^{324, 2}_1
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨  p_324 ∨ -b^{324, 2}_0
c  in DIMACS:
-23801  23802 -23803  324  23804 0
-23801  23802 -23803  324  23805 0
-23801  23802 -23803  324 -23806 0

c  -2-1 --> break 
c    ( b^{324, 1}_2 ∧  b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧ -p_324) -> break
c  in CNF:
c    -b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨  b^{324, 1}_0 ∨  p_324 ∨ break
c  in DIMACS:
-23801 -23802  23803  324 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{324, 1}_2 ∧ -b^{324, 1}_1 ∧ -b^{324, 1}_0 ∧ true) 
c  in CNF:
c    -b^{324, 1}_2 ∨  b^{324, 1}_1 ∨  b^{324, 1}_0 ∨ false 
c  in DIMACS:
-23801  23802  23803  0

c  3 does not represent an automaton state.
c    -(-b^{324, 1}_2 ∧  b^{324, 1}_1 ∧  b^{324, 1}_0 ∧ true) 
c  in CNF:
c     b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ false 
c  in DIMACS:
 23801 -23802 -23803  0
c  -3 does not represent an automaton state.
c    -( b^{324, 1}_2 ∧  b^{324, 1}_1 ∧  b^{324, 1}_0 ∧ true) 
c  in CNF:
c    -b^{324, 1}_2 ∨ -b^{324, 1}_1 ∨ -b^{324, 1}_0 ∨ false 
c  in DIMACS:
-23801 -23802 -23803  0

c i = 2
c  -2+1 --> -1
c    ( b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧  p_648) -> ( b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0)
c  in CNF:
c    -b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨  b^{324, 3}_2
c    -b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_1
c    -b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨  b^{324, 3}_0
c  in DIMACS:
-23804 -23805  23806 -648  23807 0
-23804 -23805  23806 -648 -23808 0
-23804 -23805  23806 -648  23809 0

c  -1+1 --> 0
c    ( b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0 ∧  p_648) -> (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧ -b^{324, 3}_0)
c  in CNF:
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_2
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_1
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_0
c  in DIMACS:
-23804  23805 -23806 -648 -23807 0
-23804  23805 -23806 -648 -23808 0
-23804  23805 -23806 -648 -23809 0

c  0+1 --> 1
c    (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧  p_648) -> (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0)
c  in CNF:
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_2
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_1
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨  b^{324, 3}_0
c  in DIMACS:
 23804  23805  23806 -648 -23807 0
 23804  23805  23806 -648 -23808 0
 23804  23805  23806 -648  23809 0

c  1+1 --> 2
c    (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0 ∧  p_648) -> (-b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0)
c  in CNF:
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_2
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨  b^{324, 3}_1
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ -p_648 ∨ -b^{324, 3}_0
c  in DIMACS:
 23804  23805 -23806 -648 -23807 0
 23804  23805 -23806 -648  23808 0
 23804  23805 -23806 -648 -23809 0

c  2+1 --> break 
c    (-b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧  p_648) -> break
c  in CNF:
c     b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ -p_648 ∨ break
c  in DIMACS:
 23804 -23805  23806 -648 1162 0


c  2-1 --> 1
c    (-b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧ -p_648) -> (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0)
c  in CNF:
c     b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_2
c     b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_1
c     b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨  b^{324, 3}_0
c  in DIMACS:
 23804 -23805  23806  648 -23807 0
 23804 -23805  23806  648 -23808 0
 23804 -23805  23806  648  23809 0

c  1-1 --> 0
c    (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0 ∧ -p_648) -> (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧ -b^{324, 3}_0)
c  in CNF:
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_2
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_1
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_0
c  in DIMACS:
 23804  23805 -23806  648 -23807 0
 23804  23805 -23806  648 -23808 0
 23804  23805 -23806  648 -23809 0

c  0-1 --> -1
c    (-b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧ -p_648) -> ( b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0)
c  in CNF:
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨  b^{324, 3}_2
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_1
c     b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨  b^{324, 3}_0
c  in DIMACS:
 23804  23805  23806  648  23807 0
 23804  23805  23806  648 -23808 0
 23804  23805  23806  648  23809 0

c  -1-1 --> -2
c    ( b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧  b^{324, 2}_0 ∧ -p_648) -> ( b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0)
c  in CNF:
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨  b^{324, 3}_2
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨  b^{324, 3}_1
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨  p_648 ∨ -b^{324, 3}_0
c  in DIMACS:
-23804  23805 -23806  648  23807 0
-23804  23805 -23806  648  23808 0
-23804  23805 -23806  648 -23809 0

c  -2-1 --> break 
c    ( b^{324, 2}_2 ∧  b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧ -p_648) -> break
c  in CNF:
c    -b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨  b^{324, 2}_0 ∨  p_648 ∨ break
c  in DIMACS:
-23804 -23805  23806  648 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{324, 2}_2 ∧ -b^{324, 2}_1 ∧ -b^{324, 2}_0 ∧ true) 
c  in CNF:
c    -b^{324, 2}_2 ∨  b^{324, 2}_1 ∨  b^{324, 2}_0 ∨ false 
c  in DIMACS:
-23804  23805  23806  0

c  3 does not represent an automaton state.
c    -(-b^{324, 2}_2 ∧  b^{324, 2}_1 ∧  b^{324, 2}_0 ∧ true) 
c  in CNF:
c     b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ false 
c  in DIMACS:
 23804 -23805 -23806  0
c  -3 does not represent an automaton state.
c    -( b^{324, 2}_2 ∧  b^{324, 2}_1 ∧  b^{324, 2}_0 ∧ true) 
c  in CNF:
c    -b^{324, 2}_2 ∨ -b^{324, 2}_1 ∨ -b^{324, 2}_0 ∨ false 
c  in DIMACS:
-23804 -23805 -23806  0

c i = 3
c  -2+1 --> -1
c    ( b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧  p_972) -> ( b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧  b^{324, 4}_0)
c  in CNF:
c    -b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨  b^{324, 4}_2
c    -b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_1
c    -b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨  b^{324, 4}_0
c  in DIMACS:
-23807 -23808  23809 -972  23810 0
-23807 -23808  23809 -972 -23811 0
-23807 -23808  23809 -972  23812 0

c  -1+1 --> 0
c    ( b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0 ∧  p_972) -> (-b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧ -b^{324, 4}_0)
c  in CNF:
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_2
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_1
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_0
c  in DIMACS:
-23807  23808 -23809 -972 -23810 0
-23807  23808 -23809 -972 -23811 0
-23807  23808 -23809 -972 -23812 0

c  0+1 --> 1
c    (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧  p_972) -> (-b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧  b^{324, 4}_0)
c  in CNF:
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_2
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_1
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨  b^{324, 4}_0
c  in DIMACS:
 23807  23808  23809 -972 -23810 0
 23807  23808  23809 -972 -23811 0
 23807  23808  23809 -972  23812 0

c  1+1 --> 2
c    (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0 ∧  p_972) -> (-b^{324, 4}_2 ∧  b^{324, 4}_1 ∧ -b^{324, 4}_0)
c  in CNF:
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_2
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨  b^{324, 4}_1
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ -p_972 ∨ -b^{324, 4}_0
c  in DIMACS:
 23807  23808 -23809 -972 -23810 0
 23807  23808 -23809 -972  23811 0
 23807  23808 -23809 -972 -23812 0

c  2+1 --> break 
c    (-b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧  p_972) -> break
c  in CNF:
c     b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ -p_972 ∨ break
c  in DIMACS:
 23807 -23808  23809 -972 1162 0


c  2-1 --> 1
c    (-b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧ -p_972) -> (-b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧  b^{324, 4}_0)
c  in CNF:
c     b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_2
c     b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_1
c     b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨  b^{324, 4}_0
c  in DIMACS:
 23807 -23808  23809  972 -23810 0
 23807 -23808  23809  972 -23811 0
 23807 -23808  23809  972  23812 0

c  1-1 --> 0
c    (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0 ∧ -p_972) -> (-b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧ -b^{324, 4}_0)
c  in CNF:
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_2
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_1
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_0
c  in DIMACS:
 23807  23808 -23809  972 -23810 0
 23807  23808 -23809  972 -23811 0
 23807  23808 -23809  972 -23812 0

c  0-1 --> -1
c    (-b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧ -p_972) -> ( b^{324, 4}_2 ∧ -b^{324, 4}_1 ∧  b^{324, 4}_0)
c  in CNF:
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨  b^{324, 4}_2
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_1
c     b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨  b^{324, 4}_0
c  in DIMACS:
 23807  23808  23809  972  23810 0
 23807  23808  23809  972 -23811 0
 23807  23808  23809  972  23812 0

c  -1-1 --> -2
c    ( b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧  b^{324, 3}_0 ∧ -p_972) -> ( b^{324, 4}_2 ∧  b^{324, 4}_1 ∧ -b^{324, 4}_0)
c  in CNF:
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨  b^{324, 4}_2
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨  b^{324, 4}_1
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨  p_972 ∨ -b^{324, 4}_0
c  in DIMACS:
-23807  23808 -23809  972  23810 0
-23807  23808 -23809  972  23811 0
-23807  23808 -23809  972 -23812 0

c  -2-1 --> break 
c    ( b^{324, 3}_2 ∧  b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧ -p_972) -> break
c  in CNF:
c    -b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨  b^{324, 3}_0 ∨  p_972 ∨ break
c  in DIMACS:
-23807 -23808  23809  972 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{324, 3}_2 ∧ -b^{324, 3}_1 ∧ -b^{324, 3}_0 ∧ true) 
c  in CNF:
c    -b^{324, 3}_2 ∨  b^{324, 3}_1 ∨  b^{324, 3}_0 ∨ false 
c  in DIMACS:
-23807  23808  23809  0

c  3 does not represent an automaton state.
c    -(-b^{324, 3}_2 ∧  b^{324, 3}_1 ∧  b^{324, 3}_0 ∧ true) 
c  in CNF:
c     b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ false 
c  in DIMACS:
 23807 -23808 -23809  0
c  -3 does not represent an automaton state.
c    -( b^{324, 3}_2 ∧  b^{324, 3}_1 ∧  b^{324, 3}_0 ∧ true) 
c  in CNF:
c    -b^{324, 3}_2 ∨ -b^{324, 3}_1 ∨ -b^{324, 3}_0 ∨ false 
c  in DIMACS:
-23807 -23808 -23809  0

c INIT for k = 325
c    -b^{325, 1}_2
c    -b^{325, 1}_1
c    -b^{325, 1}_0
c  in DIMACS:
-23813 0
-23814 0
-23815 0

c Transitions for k = 325
c i = 1
c  -2+1 --> -1
c    ( b^{325, 1}_2 ∧  b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧  p_325) -> ( b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0)
c  in CNF:
c    -b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨  b^{325, 2}_2
c    -b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_1
c    -b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨  b^{325, 2}_0
c  in DIMACS:
-23813 -23814  23815 -325  23816 0
-23813 -23814  23815 -325 -23817 0
-23813 -23814  23815 -325  23818 0

c  -1+1 --> 0
c    ( b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧  b^{325, 1}_0 ∧  p_325) -> (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧ -b^{325, 2}_0)
c  in CNF:
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_2
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_1
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_0
c  in DIMACS:
-23813  23814 -23815 -325 -23816 0
-23813  23814 -23815 -325 -23817 0
-23813  23814 -23815 -325 -23818 0

c  0+1 --> 1
c    (-b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧  p_325) -> (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0)
c  in CNF:
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_2
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_1
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨  b^{325, 2}_0
c  in DIMACS:
 23813  23814  23815 -325 -23816 0
 23813  23814  23815 -325 -23817 0
 23813  23814  23815 -325  23818 0

c  1+1 --> 2
c    (-b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧  b^{325, 1}_0 ∧  p_325) -> (-b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0)
c  in CNF:
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_2
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨  b^{325, 2}_1
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ -p_325 ∨ -b^{325, 2}_0
c  in DIMACS:
 23813  23814 -23815 -325 -23816 0
 23813  23814 -23815 -325  23817 0
 23813  23814 -23815 -325 -23818 0

c  2+1 --> break 
c    (-b^{325, 1}_2 ∧  b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧  p_325) -> break
c  in CNF:
c     b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ -p_325 ∨ break
c  in DIMACS:
 23813 -23814  23815 -325 1162 0


c  2-1 --> 1
c    (-b^{325, 1}_2 ∧  b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧ -p_325) -> (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0)
c  in CNF:
c     b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_2
c     b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_1
c     b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨  b^{325, 2}_0
c  in DIMACS:
 23813 -23814  23815  325 -23816 0
 23813 -23814  23815  325 -23817 0
 23813 -23814  23815  325  23818 0

c  1-1 --> 0
c    (-b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧  b^{325, 1}_0 ∧ -p_325) -> (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧ -b^{325, 2}_0)
c  in CNF:
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_2
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_1
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_0
c  in DIMACS:
 23813  23814 -23815  325 -23816 0
 23813  23814 -23815  325 -23817 0
 23813  23814 -23815  325 -23818 0

c  0-1 --> -1
c    (-b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧ -p_325) -> ( b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0)
c  in CNF:
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨  b^{325, 2}_2
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_1
c     b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨  b^{325, 2}_0
c  in DIMACS:
 23813  23814  23815  325  23816 0
 23813  23814  23815  325 -23817 0
 23813  23814  23815  325  23818 0

c  -1-1 --> -2
c    ( b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧  b^{325, 1}_0 ∧ -p_325) -> ( b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0)
c  in CNF:
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨  b^{325, 2}_2
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨  b^{325, 2}_1
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨  p_325 ∨ -b^{325, 2}_0
c  in DIMACS:
-23813  23814 -23815  325  23816 0
-23813  23814 -23815  325  23817 0
-23813  23814 -23815  325 -23818 0

c  -2-1 --> break 
c    ( b^{325, 1}_2 ∧  b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧ -p_325) -> break
c  in CNF:
c    -b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨  b^{325, 1}_0 ∨  p_325 ∨ break
c  in DIMACS:
-23813 -23814  23815  325 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{325, 1}_2 ∧ -b^{325, 1}_1 ∧ -b^{325, 1}_0 ∧ true) 
c  in CNF:
c    -b^{325, 1}_2 ∨  b^{325, 1}_1 ∨  b^{325, 1}_0 ∨ false 
c  in DIMACS:
-23813  23814  23815  0

c  3 does not represent an automaton state.
c    -(-b^{325, 1}_2 ∧  b^{325, 1}_1 ∧  b^{325, 1}_0 ∧ true) 
c  in CNF:
c     b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ false 
c  in DIMACS:
 23813 -23814 -23815  0
c  -3 does not represent an automaton state.
c    -( b^{325, 1}_2 ∧  b^{325, 1}_1 ∧  b^{325, 1}_0 ∧ true) 
c  in CNF:
c    -b^{325, 1}_2 ∨ -b^{325, 1}_1 ∨ -b^{325, 1}_0 ∨ false 
c  in DIMACS:
-23813 -23814 -23815  0

c i = 2
c  -2+1 --> -1
c    ( b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧  p_650) -> ( b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0)
c  in CNF:
c    -b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨  b^{325, 3}_2
c    -b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_1
c    -b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨  b^{325, 3}_0
c  in DIMACS:
-23816 -23817  23818 -650  23819 0
-23816 -23817  23818 -650 -23820 0
-23816 -23817  23818 -650  23821 0

c  -1+1 --> 0
c    ( b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0 ∧  p_650) -> (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧ -b^{325, 3}_0)
c  in CNF:
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_2
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_1
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_0
c  in DIMACS:
-23816  23817 -23818 -650 -23819 0
-23816  23817 -23818 -650 -23820 0
-23816  23817 -23818 -650 -23821 0

c  0+1 --> 1
c    (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧  p_650) -> (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0)
c  in CNF:
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_2
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_1
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨  b^{325, 3}_0
c  in DIMACS:
 23816  23817  23818 -650 -23819 0
 23816  23817  23818 -650 -23820 0
 23816  23817  23818 -650  23821 0

c  1+1 --> 2
c    (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0 ∧  p_650) -> (-b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0)
c  in CNF:
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_2
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨  b^{325, 3}_1
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ -p_650 ∨ -b^{325, 3}_0
c  in DIMACS:
 23816  23817 -23818 -650 -23819 0
 23816  23817 -23818 -650  23820 0
 23816  23817 -23818 -650 -23821 0

c  2+1 --> break 
c    (-b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧  p_650) -> break
c  in CNF:
c     b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ -p_650 ∨ break
c  in DIMACS:
 23816 -23817  23818 -650 1162 0


c  2-1 --> 1
c    (-b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧ -p_650) -> (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0)
c  in CNF:
c     b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_2
c     b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_1
c     b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨  b^{325, 3}_0
c  in DIMACS:
 23816 -23817  23818  650 -23819 0
 23816 -23817  23818  650 -23820 0
 23816 -23817  23818  650  23821 0

c  1-1 --> 0
c    (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0 ∧ -p_650) -> (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧ -b^{325, 3}_0)
c  in CNF:
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_2
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_1
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_0
c  in DIMACS:
 23816  23817 -23818  650 -23819 0
 23816  23817 -23818  650 -23820 0
 23816  23817 -23818  650 -23821 0

c  0-1 --> -1
c    (-b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧ -p_650) -> ( b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0)
c  in CNF:
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨  b^{325, 3}_2
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_1
c     b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨  b^{325, 3}_0
c  in DIMACS:
 23816  23817  23818  650  23819 0
 23816  23817  23818  650 -23820 0
 23816  23817  23818  650  23821 0

c  -1-1 --> -2
c    ( b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧  b^{325, 2}_0 ∧ -p_650) -> ( b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0)
c  in CNF:
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨  b^{325, 3}_2
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨  b^{325, 3}_1
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨  p_650 ∨ -b^{325, 3}_0
c  in DIMACS:
-23816  23817 -23818  650  23819 0
-23816  23817 -23818  650  23820 0
-23816  23817 -23818  650 -23821 0

c  -2-1 --> break 
c    ( b^{325, 2}_2 ∧  b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧ -p_650) -> break
c  in CNF:
c    -b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨  b^{325, 2}_0 ∨  p_650 ∨ break
c  in DIMACS:
-23816 -23817  23818  650 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{325, 2}_2 ∧ -b^{325, 2}_1 ∧ -b^{325, 2}_0 ∧ true) 
c  in CNF:
c    -b^{325, 2}_2 ∨  b^{325, 2}_1 ∨  b^{325, 2}_0 ∨ false 
c  in DIMACS:
-23816  23817  23818  0

c  3 does not represent an automaton state.
c    -(-b^{325, 2}_2 ∧  b^{325, 2}_1 ∧  b^{325, 2}_0 ∧ true) 
c  in CNF:
c     b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ false 
c  in DIMACS:
 23816 -23817 -23818  0
c  -3 does not represent an automaton state.
c    -( b^{325, 2}_2 ∧  b^{325, 2}_1 ∧  b^{325, 2}_0 ∧ true) 
c  in CNF:
c    -b^{325, 2}_2 ∨ -b^{325, 2}_1 ∨ -b^{325, 2}_0 ∨ false 
c  in DIMACS:
-23816 -23817 -23818  0

c i = 3
c  -2+1 --> -1
c    ( b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧  p_975) -> ( b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧  b^{325, 4}_0)
c  in CNF:
c    -b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨  b^{325, 4}_2
c    -b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_1
c    -b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨  b^{325, 4}_0
c  in DIMACS:
-23819 -23820  23821 -975  23822 0
-23819 -23820  23821 -975 -23823 0
-23819 -23820  23821 -975  23824 0

c  -1+1 --> 0
c    ( b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0 ∧  p_975) -> (-b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧ -b^{325, 4}_0)
c  in CNF:
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_2
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_1
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_0
c  in DIMACS:
-23819  23820 -23821 -975 -23822 0
-23819  23820 -23821 -975 -23823 0
-23819  23820 -23821 -975 -23824 0

c  0+1 --> 1
c    (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧  p_975) -> (-b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧  b^{325, 4}_0)
c  in CNF:
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_2
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_1
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨  b^{325, 4}_0
c  in DIMACS:
 23819  23820  23821 -975 -23822 0
 23819  23820  23821 -975 -23823 0
 23819  23820  23821 -975  23824 0

c  1+1 --> 2
c    (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0 ∧  p_975) -> (-b^{325, 4}_2 ∧  b^{325, 4}_1 ∧ -b^{325, 4}_0)
c  in CNF:
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_2
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨  b^{325, 4}_1
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ -p_975 ∨ -b^{325, 4}_0
c  in DIMACS:
 23819  23820 -23821 -975 -23822 0
 23819  23820 -23821 -975  23823 0
 23819  23820 -23821 -975 -23824 0

c  2+1 --> break 
c    (-b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧  p_975) -> break
c  in CNF:
c     b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ -p_975 ∨ break
c  in DIMACS:
 23819 -23820  23821 -975 1162 0


c  2-1 --> 1
c    (-b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧ -p_975) -> (-b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧  b^{325, 4}_0)
c  in CNF:
c     b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_2
c     b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_1
c     b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨  b^{325, 4}_0
c  in DIMACS:
 23819 -23820  23821  975 -23822 0
 23819 -23820  23821  975 -23823 0
 23819 -23820  23821  975  23824 0

c  1-1 --> 0
c    (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0 ∧ -p_975) -> (-b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧ -b^{325, 4}_0)
c  in CNF:
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_2
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_1
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_0
c  in DIMACS:
 23819  23820 -23821  975 -23822 0
 23819  23820 -23821  975 -23823 0
 23819  23820 -23821  975 -23824 0

c  0-1 --> -1
c    (-b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧ -p_975) -> ( b^{325, 4}_2 ∧ -b^{325, 4}_1 ∧  b^{325, 4}_0)
c  in CNF:
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨  b^{325, 4}_2
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_1
c     b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨  b^{325, 4}_0
c  in DIMACS:
 23819  23820  23821  975  23822 0
 23819  23820  23821  975 -23823 0
 23819  23820  23821  975  23824 0

c  -1-1 --> -2
c    ( b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧  b^{325, 3}_0 ∧ -p_975) -> ( b^{325, 4}_2 ∧  b^{325, 4}_1 ∧ -b^{325, 4}_0)
c  in CNF:
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨  b^{325, 4}_2
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨  b^{325, 4}_1
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨  p_975 ∨ -b^{325, 4}_0
c  in DIMACS:
-23819  23820 -23821  975  23822 0
-23819  23820 -23821  975  23823 0
-23819  23820 -23821  975 -23824 0

c  -2-1 --> break 
c    ( b^{325, 3}_2 ∧  b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧ -p_975) -> break
c  in CNF:
c    -b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨  b^{325, 3}_0 ∨  p_975 ∨ break
c  in DIMACS:
-23819 -23820  23821  975 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{325, 3}_2 ∧ -b^{325, 3}_1 ∧ -b^{325, 3}_0 ∧ true) 
c  in CNF:
c    -b^{325, 3}_2 ∨  b^{325, 3}_1 ∨  b^{325, 3}_0 ∨ false 
c  in DIMACS:
-23819  23820  23821  0

c  3 does not represent an automaton state.
c    -(-b^{325, 3}_2 ∧  b^{325, 3}_1 ∧  b^{325, 3}_0 ∧ true) 
c  in CNF:
c     b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ false 
c  in DIMACS:
 23819 -23820 -23821  0
c  -3 does not represent an automaton state.
c    -( b^{325, 3}_2 ∧  b^{325, 3}_1 ∧  b^{325, 3}_0 ∧ true) 
c  in CNF:
c    -b^{325, 3}_2 ∨ -b^{325, 3}_1 ∨ -b^{325, 3}_0 ∨ false 
c  in DIMACS:
-23819 -23820 -23821  0

c INIT for k = 326
c    -b^{326, 1}_2
c    -b^{326, 1}_1
c    -b^{326, 1}_0
c  in DIMACS:
-23825 0
-23826 0
-23827 0

c Transitions for k = 326
c i = 1
c  -2+1 --> -1
c    ( b^{326, 1}_2 ∧  b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧  p_326) -> ( b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0)
c  in CNF:
c    -b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨  b^{326, 2}_2
c    -b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_1
c    -b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨  b^{326, 2}_0
c  in DIMACS:
-23825 -23826  23827 -326  23828 0
-23825 -23826  23827 -326 -23829 0
-23825 -23826  23827 -326  23830 0

c  -1+1 --> 0
c    ( b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧  b^{326, 1}_0 ∧  p_326) -> (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧ -b^{326, 2}_0)
c  in CNF:
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_2
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_1
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_0
c  in DIMACS:
-23825  23826 -23827 -326 -23828 0
-23825  23826 -23827 -326 -23829 0
-23825  23826 -23827 -326 -23830 0

c  0+1 --> 1
c    (-b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧  p_326) -> (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0)
c  in CNF:
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_2
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_1
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨  b^{326, 2}_0
c  in DIMACS:
 23825  23826  23827 -326 -23828 0
 23825  23826  23827 -326 -23829 0
 23825  23826  23827 -326  23830 0

c  1+1 --> 2
c    (-b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧  b^{326, 1}_0 ∧  p_326) -> (-b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0)
c  in CNF:
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_2
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨  b^{326, 2}_1
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ -p_326 ∨ -b^{326, 2}_0
c  in DIMACS:
 23825  23826 -23827 -326 -23828 0
 23825  23826 -23827 -326  23829 0
 23825  23826 -23827 -326 -23830 0

c  2+1 --> break 
c    (-b^{326, 1}_2 ∧  b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧  p_326) -> break
c  in CNF:
c     b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ -p_326 ∨ break
c  in DIMACS:
 23825 -23826  23827 -326 1162 0


c  2-1 --> 1
c    (-b^{326, 1}_2 ∧  b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧ -p_326) -> (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0)
c  in CNF:
c     b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_2
c     b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_1
c     b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨  b^{326, 2}_0
c  in DIMACS:
 23825 -23826  23827  326 -23828 0
 23825 -23826  23827  326 -23829 0
 23825 -23826  23827  326  23830 0

c  1-1 --> 0
c    (-b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧  b^{326, 1}_0 ∧ -p_326) -> (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧ -b^{326, 2}_0)
c  in CNF:
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_2
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_1
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_0
c  in DIMACS:
 23825  23826 -23827  326 -23828 0
 23825  23826 -23827  326 -23829 0
 23825  23826 -23827  326 -23830 0

c  0-1 --> -1
c    (-b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧ -p_326) -> ( b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0)
c  in CNF:
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨  b^{326, 2}_2
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_1
c     b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨  b^{326, 2}_0
c  in DIMACS:
 23825  23826  23827  326  23828 0
 23825  23826  23827  326 -23829 0
 23825  23826  23827  326  23830 0

c  -1-1 --> -2
c    ( b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧  b^{326, 1}_0 ∧ -p_326) -> ( b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0)
c  in CNF:
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨  b^{326, 2}_2
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨  b^{326, 2}_1
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨  p_326 ∨ -b^{326, 2}_0
c  in DIMACS:
-23825  23826 -23827  326  23828 0
-23825  23826 -23827  326  23829 0
-23825  23826 -23827  326 -23830 0

c  -2-1 --> break 
c    ( b^{326, 1}_2 ∧  b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧ -p_326) -> break
c  in CNF:
c    -b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨  b^{326, 1}_0 ∨  p_326 ∨ break
c  in DIMACS:
-23825 -23826  23827  326 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{326, 1}_2 ∧ -b^{326, 1}_1 ∧ -b^{326, 1}_0 ∧ true) 
c  in CNF:
c    -b^{326, 1}_2 ∨  b^{326, 1}_1 ∨  b^{326, 1}_0 ∨ false 
c  in DIMACS:
-23825  23826  23827  0

c  3 does not represent an automaton state.
c    -(-b^{326, 1}_2 ∧  b^{326, 1}_1 ∧  b^{326, 1}_0 ∧ true) 
c  in CNF:
c     b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ false 
c  in DIMACS:
 23825 -23826 -23827  0
c  -3 does not represent an automaton state.
c    -( b^{326, 1}_2 ∧  b^{326, 1}_1 ∧  b^{326, 1}_0 ∧ true) 
c  in CNF:
c    -b^{326, 1}_2 ∨ -b^{326, 1}_1 ∨ -b^{326, 1}_0 ∨ false 
c  in DIMACS:
-23825 -23826 -23827  0

c i = 2
c  -2+1 --> -1
c    ( b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧  p_652) -> ( b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0)
c  in CNF:
c    -b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨  b^{326, 3}_2
c    -b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_1
c    -b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨  b^{326, 3}_0
c  in DIMACS:
-23828 -23829  23830 -652  23831 0
-23828 -23829  23830 -652 -23832 0
-23828 -23829  23830 -652  23833 0

c  -1+1 --> 0
c    ( b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0 ∧  p_652) -> (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧ -b^{326, 3}_0)
c  in CNF:
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_2
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_1
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_0
c  in DIMACS:
-23828  23829 -23830 -652 -23831 0
-23828  23829 -23830 -652 -23832 0
-23828  23829 -23830 -652 -23833 0

c  0+1 --> 1
c    (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧  p_652) -> (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0)
c  in CNF:
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_2
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_1
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨  b^{326, 3}_0
c  in DIMACS:
 23828  23829  23830 -652 -23831 0
 23828  23829  23830 -652 -23832 0
 23828  23829  23830 -652  23833 0

c  1+1 --> 2
c    (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0 ∧  p_652) -> (-b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0)
c  in CNF:
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_2
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨  b^{326, 3}_1
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ -p_652 ∨ -b^{326, 3}_0
c  in DIMACS:
 23828  23829 -23830 -652 -23831 0
 23828  23829 -23830 -652  23832 0
 23828  23829 -23830 -652 -23833 0

c  2+1 --> break 
c    (-b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧  p_652) -> break
c  in CNF:
c     b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ -p_652 ∨ break
c  in DIMACS:
 23828 -23829  23830 -652 1162 0


c  2-1 --> 1
c    (-b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧ -p_652) -> (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0)
c  in CNF:
c     b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_2
c     b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_1
c     b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨  b^{326, 3}_0
c  in DIMACS:
 23828 -23829  23830  652 -23831 0
 23828 -23829  23830  652 -23832 0
 23828 -23829  23830  652  23833 0

c  1-1 --> 0
c    (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0 ∧ -p_652) -> (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧ -b^{326, 3}_0)
c  in CNF:
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_2
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_1
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_0
c  in DIMACS:
 23828  23829 -23830  652 -23831 0
 23828  23829 -23830  652 -23832 0
 23828  23829 -23830  652 -23833 0

c  0-1 --> -1
c    (-b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧ -p_652) -> ( b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0)
c  in CNF:
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨  b^{326, 3}_2
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_1
c     b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨  b^{326, 3}_0
c  in DIMACS:
 23828  23829  23830  652  23831 0
 23828  23829  23830  652 -23832 0
 23828  23829  23830  652  23833 0

c  -1-1 --> -2
c    ( b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧  b^{326, 2}_0 ∧ -p_652) -> ( b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0)
c  in CNF:
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨  b^{326, 3}_2
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨  b^{326, 3}_1
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨  p_652 ∨ -b^{326, 3}_0
c  in DIMACS:
-23828  23829 -23830  652  23831 0
-23828  23829 -23830  652  23832 0
-23828  23829 -23830  652 -23833 0

c  -2-1 --> break 
c    ( b^{326, 2}_2 ∧  b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧ -p_652) -> break
c  in CNF:
c    -b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨  b^{326, 2}_0 ∨  p_652 ∨ break
c  in DIMACS:
-23828 -23829  23830  652 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{326, 2}_2 ∧ -b^{326, 2}_1 ∧ -b^{326, 2}_0 ∧ true) 
c  in CNF:
c    -b^{326, 2}_2 ∨  b^{326, 2}_1 ∨  b^{326, 2}_0 ∨ false 
c  in DIMACS:
-23828  23829  23830  0

c  3 does not represent an automaton state.
c    -(-b^{326, 2}_2 ∧  b^{326, 2}_1 ∧  b^{326, 2}_0 ∧ true) 
c  in CNF:
c     b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ false 
c  in DIMACS:
 23828 -23829 -23830  0
c  -3 does not represent an automaton state.
c    -( b^{326, 2}_2 ∧  b^{326, 2}_1 ∧  b^{326, 2}_0 ∧ true) 
c  in CNF:
c    -b^{326, 2}_2 ∨ -b^{326, 2}_1 ∨ -b^{326, 2}_0 ∨ false 
c  in DIMACS:
-23828 -23829 -23830  0

c i = 3
c  -2+1 --> -1
c    ( b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧  p_978) -> ( b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧  b^{326, 4}_0)
c  in CNF:
c    -b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨  b^{326, 4}_2
c    -b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_1
c    -b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨  b^{326, 4}_0
c  in DIMACS:
-23831 -23832  23833 -978  23834 0
-23831 -23832  23833 -978 -23835 0
-23831 -23832  23833 -978  23836 0

c  -1+1 --> 0
c    ( b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0 ∧  p_978) -> (-b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧ -b^{326, 4}_0)
c  in CNF:
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_2
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_1
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_0
c  in DIMACS:
-23831  23832 -23833 -978 -23834 0
-23831  23832 -23833 -978 -23835 0
-23831  23832 -23833 -978 -23836 0

c  0+1 --> 1
c    (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧  p_978) -> (-b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧  b^{326, 4}_0)
c  in CNF:
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_2
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_1
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨  b^{326, 4}_0
c  in DIMACS:
 23831  23832  23833 -978 -23834 0
 23831  23832  23833 -978 -23835 0
 23831  23832  23833 -978  23836 0

c  1+1 --> 2
c    (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0 ∧  p_978) -> (-b^{326, 4}_2 ∧  b^{326, 4}_1 ∧ -b^{326, 4}_0)
c  in CNF:
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_2
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨  b^{326, 4}_1
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ -p_978 ∨ -b^{326, 4}_0
c  in DIMACS:
 23831  23832 -23833 -978 -23834 0
 23831  23832 -23833 -978  23835 0
 23831  23832 -23833 -978 -23836 0

c  2+1 --> break 
c    (-b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧  p_978) -> break
c  in CNF:
c     b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ -p_978 ∨ break
c  in DIMACS:
 23831 -23832  23833 -978 1162 0


c  2-1 --> 1
c    (-b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧ -p_978) -> (-b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧  b^{326, 4}_0)
c  in CNF:
c     b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_2
c     b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_1
c     b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨  b^{326, 4}_0
c  in DIMACS:
 23831 -23832  23833  978 -23834 0
 23831 -23832  23833  978 -23835 0
 23831 -23832  23833  978  23836 0

c  1-1 --> 0
c    (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0 ∧ -p_978) -> (-b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧ -b^{326, 4}_0)
c  in CNF:
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_2
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_1
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_0
c  in DIMACS:
 23831  23832 -23833  978 -23834 0
 23831  23832 -23833  978 -23835 0
 23831  23832 -23833  978 -23836 0

c  0-1 --> -1
c    (-b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧ -p_978) -> ( b^{326, 4}_2 ∧ -b^{326, 4}_1 ∧  b^{326, 4}_0)
c  in CNF:
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨  b^{326, 4}_2
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_1
c     b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨  b^{326, 4}_0
c  in DIMACS:
 23831  23832  23833  978  23834 0
 23831  23832  23833  978 -23835 0
 23831  23832  23833  978  23836 0

c  -1-1 --> -2
c    ( b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧  b^{326, 3}_0 ∧ -p_978) -> ( b^{326, 4}_2 ∧  b^{326, 4}_1 ∧ -b^{326, 4}_0)
c  in CNF:
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨  b^{326, 4}_2
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨  b^{326, 4}_1
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨  p_978 ∨ -b^{326, 4}_0
c  in DIMACS:
-23831  23832 -23833  978  23834 0
-23831  23832 -23833  978  23835 0
-23831  23832 -23833  978 -23836 0

c  -2-1 --> break 
c    ( b^{326, 3}_2 ∧  b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧ -p_978) -> break
c  in CNF:
c    -b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨  b^{326, 3}_0 ∨  p_978 ∨ break
c  in DIMACS:
-23831 -23832  23833  978 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{326, 3}_2 ∧ -b^{326, 3}_1 ∧ -b^{326, 3}_0 ∧ true) 
c  in CNF:
c    -b^{326, 3}_2 ∨  b^{326, 3}_1 ∨  b^{326, 3}_0 ∨ false 
c  in DIMACS:
-23831  23832  23833  0

c  3 does not represent an automaton state.
c    -(-b^{326, 3}_2 ∧  b^{326, 3}_1 ∧  b^{326, 3}_0 ∧ true) 
c  in CNF:
c     b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ false 
c  in DIMACS:
 23831 -23832 -23833  0
c  -3 does not represent an automaton state.
c    -( b^{326, 3}_2 ∧  b^{326, 3}_1 ∧  b^{326, 3}_0 ∧ true) 
c  in CNF:
c    -b^{326, 3}_2 ∨ -b^{326, 3}_1 ∨ -b^{326, 3}_0 ∨ false 
c  in DIMACS:
-23831 -23832 -23833  0

c INIT for k = 327
c    -b^{327, 1}_2
c    -b^{327, 1}_1
c    -b^{327, 1}_0
c  in DIMACS:
-23837 0
-23838 0
-23839 0

c Transitions for k = 327
c i = 1
c  -2+1 --> -1
c    ( b^{327, 1}_2 ∧  b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧  p_327) -> ( b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0)
c  in CNF:
c    -b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨  b^{327, 2}_2
c    -b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_1
c    -b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨  b^{327, 2}_0
c  in DIMACS:
-23837 -23838  23839 -327  23840 0
-23837 -23838  23839 -327 -23841 0
-23837 -23838  23839 -327  23842 0

c  -1+1 --> 0
c    ( b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧  b^{327, 1}_0 ∧  p_327) -> (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧ -b^{327, 2}_0)
c  in CNF:
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_2
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_1
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_0
c  in DIMACS:
-23837  23838 -23839 -327 -23840 0
-23837  23838 -23839 -327 -23841 0
-23837  23838 -23839 -327 -23842 0

c  0+1 --> 1
c    (-b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧  p_327) -> (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0)
c  in CNF:
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_2
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_1
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨  b^{327, 2}_0
c  in DIMACS:
 23837  23838  23839 -327 -23840 0
 23837  23838  23839 -327 -23841 0
 23837  23838  23839 -327  23842 0

c  1+1 --> 2
c    (-b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧  b^{327, 1}_0 ∧  p_327) -> (-b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0)
c  in CNF:
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_2
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨  b^{327, 2}_1
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ -p_327 ∨ -b^{327, 2}_0
c  in DIMACS:
 23837  23838 -23839 -327 -23840 0
 23837  23838 -23839 -327  23841 0
 23837  23838 -23839 -327 -23842 0

c  2+1 --> break 
c    (-b^{327, 1}_2 ∧  b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧  p_327) -> break
c  in CNF:
c     b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ -p_327 ∨ break
c  in DIMACS:
 23837 -23838  23839 -327 1162 0


c  2-1 --> 1
c    (-b^{327, 1}_2 ∧  b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧ -p_327) -> (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0)
c  in CNF:
c     b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_2
c     b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_1
c     b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨  b^{327, 2}_0
c  in DIMACS:
 23837 -23838  23839  327 -23840 0
 23837 -23838  23839  327 -23841 0
 23837 -23838  23839  327  23842 0

c  1-1 --> 0
c    (-b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧  b^{327, 1}_0 ∧ -p_327) -> (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧ -b^{327, 2}_0)
c  in CNF:
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_2
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_1
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_0
c  in DIMACS:
 23837  23838 -23839  327 -23840 0
 23837  23838 -23839  327 -23841 0
 23837  23838 -23839  327 -23842 0

c  0-1 --> -1
c    (-b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧ -p_327) -> ( b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0)
c  in CNF:
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨  b^{327, 2}_2
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_1
c     b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨  b^{327, 2}_0
c  in DIMACS:
 23837  23838  23839  327  23840 0
 23837  23838  23839  327 -23841 0
 23837  23838  23839  327  23842 0

c  -1-1 --> -2
c    ( b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧  b^{327, 1}_0 ∧ -p_327) -> ( b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0)
c  in CNF:
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨  b^{327, 2}_2
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨  b^{327, 2}_1
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨  p_327 ∨ -b^{327, 2}_0
c  in DIMACS:
-23837  23838 -23839  327  23840 0
-23837  23838 -23839  327  23841 0
-23837  23838 -23839  327 -23842 0

c  -2-1 --> break 
c    ( b^{327, 1}_2 ∧  b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧ -p_327) -> break
c  in CNF:
c    -b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨  b^{327, 1}_0 ∨  p_327 ∨ break
c  in DIMACS:
-23837 -23838  23839  327 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{327, 1}_2 ∧ -b^{327, 1}_1 ∧ -b^{327, 1}_0 ∧ true) 
c  in CNF:
c    -b^{327, 1}_2 ∨  b^{327, 1}_1 ∨  b^{327, 1}_0 ∨ false 
c  in DIMACS:
-23837  23838  23839  0

c  3 does not represent an automaton state.
c    -(-b^{327, 1}_2 ∧  b^{327, 1}_1 ∧  b^{327, 1}_0 ∧ true) 
c  in CNF:
c     b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ false 
c  in DIMACS:
 23837 -23838 -23839  0
c  -3 does not represent an automaton state.
c    -( b^{327, 1}_2 ∧  b^{327, 1}_1 ∧  b^{327, 1}_0 ∧ true) 
c  in CNF:
c    -b^{327, 1}_2 ∨ -b^{327, 1}_1 ∨ -b^{327, 1}_0 ∨ false 
c  in DIMACS:
-23837 -23838 -23839  0

c i = 2
c  -2+1 --> -1
c    ( b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧  p_654) -> ( b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0)
c  in CNF:
c    -b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨  b^{327, 3}_2
c    -b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_1
c    -b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨  b^{327, 3}_0
c  in DIMACS:
-23840 -23841  23842 -654  23843 0
-23840 -23841  23842 -654 -23844 0
-23840 -23841  23842 -654  23845 0

c  -1+1 --> 0
c    ( b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0 ∧  p_654) -> (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧ -b^{327, 3}_0)
c  in CNF:
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_2
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_1
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_0
c  in DIMACS:
-23840  23841 -23842 -654 -23843 0
-23840  23841 -23842 -654 -23844 0
-23840  23841 -23842 -654 -23845 0

c  0+1 --> 1
c    (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧  p_654) -> (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0)
c  in CNF:
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_2
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_1
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨  b^{327, 3}_0
c  in DIMACS:
 23840  23841  23842 -654 -23843 0
 23840  23841  23842 -654 -23844 0
 23840  23841  23842 -654  23845 0

c  1+1 --> 2
c    (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0 ∧  p_654) -> (-b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0)
c  in CNF:
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_2
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨  b^{327, 3}_1
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ -p_654 ∨ -b^{327, 3}_0
c  in DIMACS:
 23840  23841 -23842 -654 -23843 0
 23840  23841 -23842 -654  23844 0
 23840  23841 -23842 -654 -23845 0

c  2+1 --> break 
c    (-b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧  p_654) -> break
c  in CNF:
c     b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ -p_654 ∨ break
c  in DIMACS:
 23840 -23841  23842 -654 1162 0


c  2-1 --> 1
c    (-b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧ -p_654) -> (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0)
c  in CNF:
c     b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_2
c     b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_1
c     b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨  b^{327, 3}_0
c  in DIMACS:
 23840 -23841  23842  654 -23843 0
 23840 -23841  23842  654 -23844 0
 23840 -23841  23842  654  23845 0

c  1-1 --> 0
c    (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0 ∧ -p_654) -> (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧ -b^{327, 3}_0)
c  in CNF:
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_2
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_1
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_0
c  in DIMACS:
 23840  23841 -23842  654 -23843 0
 23840  23841 -23842  654 -23844 0
 23840  23841 -23842  654 -23845 0

c  0-1 --> -1
c    (-b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧ -p_654) -> ( b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0)
c  in CNF:
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨  b^{327, 3}_2
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_1
c     b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨  b^{327, 3}_0
c  in DIMACS:
 23840  23841  23842  654  23843 0
 23840  23841  23842  654 -23844 0
 23840  23841  23842  654  23845 0

c  -1-1 --> -2
c    ( b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧  b^{327, 2}_0 ∧ -p_654) -> ( b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0)
c  in CNF:
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨  b^{327, 3}_2
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨  b^{327, 3}_1
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨  p_654 ∨ -b^{327, 3}_0
c  in DIMACS:
-23840  23841 -23842  654  23843 0
-23840  23841 -23842  654  23844 0
-23840  23841 -23842  654 -23845 0

c  -2-1 --> break 
c    ( b^{327, 2}_2 ∧  b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧ -p_654) -> break
c  in CNF:
c    -b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨  b^{327, 2}_0 ∨  p_654 ∨ break
c  in DIMACS:
-23840 -23841  23842  654 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{327, 2}_2 ∧ -b^{327, 2}_1 ∧ -b^{327, 2}_0 ∧ true) 
c  in CNF:
c    -b^{327, 2}_2 ∨  b^{327, 2}_1 ∨  b^{327, 2}_0 ∨ false 
c  in DIMACS:
-23840  23841  23842  0

c  3 does not represent an automaton state.
c    -(-b^{327, 2}_2 ∧  b^{327, 2}_1 ∧  b^{327, 2}_0 ∧ true) 
c  in CNF:
c     b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ false 
c  in DIMACS:
 23840 -23841 -23842  0
c  -3 does not represent an automaton state.
c    -( b^{327, 2}_2 ∧  b^{327, 2}_1 ∧  b^{327, 2}_0 ∧ true) 
c  in CNF:
c    -b^{327, 2}_2 ∨ -b^{327, 2}_1 ∨ -b^{327, 2}_0 ∨ false 
c  in DIMACS:
-23840 -23841 -23842  0

c i = 3
c  -2+1 --> -1
c    ( b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧  p_981) -> ( b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧  b^{327, 4}_0)
c  in CNF:
c    -b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨  b^{327, 4}_2
c    -b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_1
c    -b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨  b^{327, 4}_0
c  in DIMACS:
-23843 -23844  23845 -981  23846 0
-23843 -23844  23845 -981 -23847 0
-23843 -23844  23845 -981  23848 0

c  -1+1 --> 0
c    ( b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0 ∧  p_981) -> (-b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧ -b^{327, 4}_0)
c  in CNF:
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_2
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_1
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_0
c  in DIMACS:
-23843  23844 -23845 -981 -23846 0
-23843  23844 -23845 -981 -23847 0
-23843  23844 -23845 -981 -23848 0

c  0+1 --> 1
c    (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧  p_981) -> (-b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧  b^{327, 4}_0)
c  in CNF:
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_2
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_1
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨  b^{327, 4}_0
c  in DIMACS:
 23843  23844  23845 -981 -23846 0
 23843  23844  23845 -981 -23847 0
 23843  23844  23845 -981  23848 0

c  1+1 --> 2
c    (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0 ∧  p_981) -> (-b^{327, 4}_2 ∧  b^{327, 4}_1 ∧ -b^{327, 4}_0)
c  in CNF:
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_2
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨  b^{327, 4}_1
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ -p_981 ∨ -b^{327, 4}_0
c  in DIMACS:
 23843  23844 -23845 -981 -23846 0
 23843  23844 -23845 -981  23847 0
 23843  23844 -23845 -981 -23848 0

c  2+1 --> break 
c    (-b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧  p_981) -> break
c  in CNF:
c     b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ -p_981 ∨ break
c  in DIMACS:
 23843 -23844  23845 -981 1162 0


c  2-1 --> 1
c    (-b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧ -p_981) -> (-b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧  b^{327, 4}_0)
c  in CNF:
c     b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_2
c     b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_1
c     b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨  b^{327, 4}_0
c  in DIMACS:
 23843 -23844  23845  981 -23846 0
 23843 -23844  23845  981 -23847 0
 23843 -23844  23845  981  23848 0

c  1-1 --> 0
c    (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0 ∧ -p_981) -> (-b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧ -b^{327, 4}_0)
c  in CNF:
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_2
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_1
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_0
c  in DIMACS:
 23843  23844 -23845  981 -23846 0
 23843  23844 -23845  981 -23847 0
 23843  23844 -23845  981 -23848 0

c  0-1 --> -1
c    (-b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧ -p_981) -> ( b^{327, 4}_2 ∧ -b^{327, 4}_1 ∧  b^{327, 4}_0)
c  in CNF:
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨  b^{327, 4}_2
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_1
c     b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨  b^{327, 4}_0
c  in DIMACS:
 23843  23844  23845  981  23846 0
 23843  23844  23845  981 -23847 0
 23843  23844  23845  981  23848 0

c  -1-1 --> -2
c    ( b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧  b^{327, 3}_0 ∧ -p_981) -> ( b^{327, 4}_2 ∧  b^{327, 4}_1 ∧ -b^{327, 4}_0)
c  in CNF:
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨  b^{327, 4}_2
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨  b^{327, 4}_1
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨  p_981 ∨ -b^{327, 4}_0
c  in DIMACS:
-23843  23844 -23845  981  23846 0
-23843  23844 -23845  981  23847 0
-23843  23844 -23845  981 -23848 0

c  -2-1 --> break 
c    ( b^{327, 3}_2 ∧  b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧ -p_981) -> break
c  in CNF:
c    -b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨  b^{327, 3}_0 ∨  p_981 ∨ break
c  in DIMACS:
-23843 -23844  23845  981 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{327, 3}_2 ∧ -b^{327, 3}_1 ∧ -b^{327, 3}_0 ∧ true) 
c  in CNF:
c    -b^{327, 3}_2 ∨  b^{327, 3}_1 ∨  b^{327, 3}_0 ∨ false 
c  in DIMACS:
-23843  23844  23845  0

c  3 does not represent an automaton state.
c    -(-b^{327, 3}_2 ∧  b^{327, 3}_1 ∧  b^{327, 3}_0 ∧ true) 
c  in CNF:
c     b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ false 
c  in DIMACS:
 23843 -23844 -23845  0
c  -3 does not represent an automaton state.
c    -( b^{327, 3}_2 ∧  b^{327, 3}_1 ∧  b^{327, 3}_0 ∧ true) 
c  in CNF:
c    -b^{327, 3}_2 ∨ -b^{327, 3}_1 ∨ -b^{327, 3}_0 ∨ false 
c  in DIMACS:
-23843 -23844 -23845  0

c INIT for k = 328
c    -b^{328, 1}_2
c    -b^{328, 1}_1
c    -b^{328, 1}_0
c  in DIMACS:
-23849 0
-23850 0
-23851 0

c Transitions for k = 328
c i = 1
c  -2+1 --> -1
c    ( b^{328, 1}_2 ∧  b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧  p_328) -> ( b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0)
c  in CNF:
c    -b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨  b^{328, 2}_2
c    -b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_1
c    -b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨  b^{328, 2}_0
c  in DIMACS:
-23849 -23850  23851 -328  23852 0
-23849 -23850  23851 -328 -23853 0
-23849 -23850  23851 -328  23854 0

c  -1+1 --> 0
c    ( b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧  b^{328, 1}_0 ∧  p_328) -> (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧ -b^{328, 2}_0)
c  in CNF:
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_2
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_1
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_0
c  in DIMACS:
-23849  23850 -23851 -328 -23852 0
-23849  23850 -23851 -328 -23853 0
-23849  23850 -23851 -328 -23854 0

c  0+1 --> 1
c    (-b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧  p_328) -> (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0)
c  in CNF:
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_2
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_1
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨  b^{328, 2}_0
c  in DIMACS:
 23849  23850  23851 -328 -23852 0
 23849  23850  23851 -328 -23853 0
 23849  23850  23851 -328  23854 0

c  1+1 --> 2
c    (-b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧  b^{328, 1}_0 ∧  p_328) -> (-b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0)
c  in CNF:
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_2
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨  b^{328, 2}_1
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ -p_328 ∨ -b^{328, 2}_0
c  in DIMACS:
 23849  23850 -23851 -328 -23852 0
 23849  23850 -23851 -328  23853 0
 23849  23850 -23851 -328 -23854 0

c  2+1 --> break 
c    (-b^{328, 1}_2 ∧  b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧  p_328) -> break
c  in CNF:
c     b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ -p_328 ∨ break
c  in DIMACS:
 23849 -23850  23851 -328 1162 0


c  2-1 --> 1
c    (-b^{328, 1}_2 ∧  b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧ -p_328) -> (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0)
c  in CNF:
c     b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_2
c     b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_1
c     b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨  b^{328, 2}_0
c  in DIMACS:
 23849 -23850  23851  328 -23852 0
 23849 -23850  23851  328 -23853 0
 23849 -23850  23851  328  23854 0

c  1-1 --> 0
c    (-b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧  b^{328, 1}_0 ∧ -p_328) -> (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧ -b^{328, 2}_0)
c  in CNF:
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_2
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_1
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_0
c  in DIMACS:
 23849  23850 -23851  328 -23852 0
 23849  23850 -23851  328 -23853 0
 23849  23850 -23851  328 -23854 0

c  0-1 --> -1
c    (-b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧ -p_328) -> ( b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0)
c  in CNF:
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨  b^{328, 2}_2
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_1
c     b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨  b^{328, 2}_0
c  in DIMACS:
 23849  23850  23851  328  23852 0
 23849  23850  23851  328 -23853 0
 23849  23850  23851  328  23854 0

c  -1-1 --> -2
c    ( b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧  b^{328, 1}_0 ∧ -p_328) -> ( b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0)
c  in CNF:
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨  b^{328, 2}_2
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨  b^{328, 2}_1
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨  p_328 ∨ -b^{328, 2}_0
c  in DIMACS:
-23849  23850 -23851  328  23852 0
-23849  23850 -23851  328  23853 0
-23849  23850 -23851  328 -23854 0

c  -2-1 --> break 
c    ( b^{328, 1}_2 ∧  b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧ -p_328) -> break
c  in CNF:
c    -b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨  b^{328, 1}_0 ∨  p_328 ∨ break
c  in DIMACS:
-23849 -23850  23851  328 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{328, 1}_2 ∧ -b^{328, 1}_1 ∧ -b^{328, 1}_0 ∧ true) 
c  in CNF:
c    -b^{328, 1}_2 ∨  b^{328, 1}_1 ∨  b^{328, 1}_0 ∨ false 
c  in DIMACS:
-23849  23850  23851  0

c  3 does not represent an automaton state.
c    -(-b^{328, 1}_2 ∧  b^{328, 1}_1 ∧  b^{328, 1}_0 ∧ true) 
c  in CNF:
c     b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ false 
c  in DIMACS:
 23849 -23850 -23851  0
c  -3 does not represent an automaton state.
c    -( b^{328, 1}_2 ∧  b^{328, 1}_1 ∧  b^{328, 1}_0 ∧ true) 
c  in CNF:
c    -b^{328, 1}_2 ∨ -b^{328, 1}_1 ∨ -b^{328, 1}_0 ∨ false 
c  in DIMACS:
-23849 -23850 -23851  0

c i = 2
c  -2+1 --> -1
c    ( b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧  p_656) -> ( b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0)
c  in CNF:
c    -b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨  b^{328, 3}_2
c    -b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_1
c    -b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨  b^{328, 3}_0
c  in DIMACS:
-23852 -23853  23854 -656  23855 0
-23852 -23853  23854 -656 -23856 0
-23852 -23853  23854 -656  23857 0

c  -1+1 --> 0
c    ( b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0 ∧  p_656) -> (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧ -b^{328, 3}_0)
c  in CNF:
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_2
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_1
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_0
c  in DIMACS:
-23852  23853 -23854 -656 -23855 0
-23852  23853 -23854 -656 -23856 0
-23852  23853 -23854 -656 -23857 0

c  0+1 --> 1
c    (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧  p_656) -> (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0)
c  in CNF:
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_2
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_1
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨  b^{328, 3}_0
c  in DIMACS:
 23852  23853  23854 -656 -23855 0
 23852  23853  23854 -656 -23856 0
 23852  23853  23854 -656  23857 0

c  1+1 --> 2
c    (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0 ∧  p_656) -> (-b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0)
c  in CNF:
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_2
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨  b^{328, 3}_1
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ -p_656 ∨ -b^{328, 3}_0
c  in DIMACS:
 23852  23853 -23854 -656 -23855 0
 23852  23853 -23854 -656  23856 0
 23852  23853 -23854 -656 -23857 0

c  2+1 --> break 
c    (-b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧  p_656) -> break
c  in CNF:
c     b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ -p_656 ∨ break
c  in DIMACS:
 23852 -23853  23854 -656 1162 0


c  2-1 --> 1
c    (-b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧ -p_656) -> (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0)
c  in CNF:
c     b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_2
c     b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_1
c     b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨  b^{328, 3}_0
c  in DIMACS:
 23852 -23853  23854  656 -23855 0
 23852 -23853  23854  656 -23856 0
 23852 -23853  23854  656  23857 0

c  1-1 --> 0
c    (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0 ∧ -p_656) -> (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧ -b^{328, 3}_0)
c  in CNF:
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_2
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_1
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_0
c  in DIMACS:
 23852  23853 -23854  656 -23855 0
 23852  23853 -23854  656 -23856 0
 23852  23853 -23854  656 -23857 0

c  0-1 --> -1
c    (-b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧ -p_656) -> ( b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0)
c  in CNF:
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨  b^{328, 3}_2
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_1
c     b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨  b^{328, 3}_0
c  in DIMACS:
 23852  23853  23854  656  23855 0
 23852  23853  23854  656 -23856 0
 23852  23853  23854  656  23857 0

c  -1-1 --> -2
c    ( b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧  b^{328, 2}_0 ∧ -p_656) -> ( b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0)
c  in CNF:
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨  b^{328, 3}_2
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨  b^{328, 3}_1
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨  p_656 ∨ -b^{328, 3}_0
c  in DIMACS:
-23852  23853 -23854  656  23855 0
-23852  23853 -23854  656  23856 0
-23852  23853 -23854  656 -23857 0

c  -2-1 --> break 
c    ( b^{328, 2}_2 ∧  b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧ -p_656) -> break
c  in CNF:
c    -b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨  b^{328, 2}_0 ∨  p_656 ∨ break
c  in DIMACS:
-23852 -23853  23854  656 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{328, 2}_2 ∧ -b^{328, 2}_1 ∧ -b^{328, 2}_0 ∧ true) 
c  in CNF:
c    -b^{328, 2}_2 ∨  b^{328, 2}_1 ∨  b^{328, 2}_0 ∨ false 
c  in DIMACS:
-23852  23853  23854  0

c  3 does not represent an automaton state.
c    -(-b^{328, 2}_2 ∧  b^{328, 2}_1 ∧  b^{328, 2}_0 ∧ true) 
c  in CNF:
c     b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ false 
c  in DIMACS:
 23852 -23853 -23854  0
c  -3 does not represent an automaton state.
c    -( b^{328, 2}_2 ∧  b^{328, 2}_1 ∧  b^{328, 2}_0 ∧ true) 
c  in CNF:
c    -b^{328, 2}_2 ∨ -b^{328, 2}_1 ∨ -b^{328, 2}_0 ∨ false 
c  in DIMACS:
-23852 -23853 -23854  0

c i = 3
c  -2+1 --> -1
c    ( b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧  p_984) -> ( b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧  b^{328, 4}_0)
c  in CNF:
c    -b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨  b^{328, 4}_2
c    -b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_1
c    -b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨  b^{328, 4}_0
c  in DIMACS:
-23855 -23856  23857 -984  23858 0
-23855 -23856  23857 -984 -23859 0
-23855 -23856  23857 -984  23860 0

c  -1+1 --> 0
c    ( b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0 ∧  p_984) -> (-b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧ -b^{328, 4}_0)
c  in CNF:
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_2
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_1
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_0
c  in DIMACS:
-23855  23856 -23857 -984 -23858 0
-23855  23856 -23857 -984 -23859 0
-23855  23856 -23857 -984 -23860 0

c  0+1 --> 1
c    (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧  p_984) -> (-b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧  b^{328, 4}_0)
c  in CNF:
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_2
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_1
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨  b^{328, 4}_0
c  in DIMACS:
 23855  23856  23857 -984 -23858 0
 23855  23856  23857 -984 -23859 0
 23855  23856  23857 -984  23860 0

c  1+1 --> 2
c    (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0 ∧  p_984) -> (-b^{328, 4}_2 ∧  b^{328, 4}_1 ∧ -b^{328, 4}_0)
c  in CNF:
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_2
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨  b^{328, 4}_1
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ -p_984 ∨ -b^{328, 4}_0
c  in DIMACS:
 23855  23856 -23857 -984 -23858 0
 23855  23856 -23857 -984  23859 0
 23855  23856 -23857 -984 -23860 0

c  2+1 --> break 
c    (-b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧  p_984) -> break
c  in CNF:
c     b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ -p_984 ∨ break
c  in DIMACS:
 23855 -23856  23857 -984 1162 0


c  2-1 --> 1
c    (-b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧ -p_984) -> (-b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧  b^{328, 4}_0)
c  in CNF:
c     b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_2
c     b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_1
c     b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨  b^{328, 4}_0
c  in DIMACS:
 23855 -23856  23857  984 -23858 0
 23855 -23856  23857  984 -23859 0
 23855 -23856  23857  984  23860 0

c  1-1 --> 0
c    (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0 ∧ -p_984) -> (-b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧ -b^{328, 4}_0)
c  in CNF:
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_2
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_1
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_0
c  in DIMACS:
 23855  23856 -23857  984 -23858 0
 23855  23856 -23857  984 -23859 0
 23855  23856 -23857  984 -23860 0

c  0-1 --> -1
c    (-b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧ -p_984) -> ( b^{328, 4}_2 ∧ -b^{328, 4}_1 ∧  b^{328, 4}_0)
c  in CNF:
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨  b^{328, 4}_2
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_1
c     b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨  b^{328, 4}_0
c  in DIMACS:
 23855  23856  23857  984  23858 0
 23855  23856  23857  984 -23859 0
 23855  23856  23857  984  23860 0

c  -1-1 --> -2
c    ( b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧  b^{328, 3}_0 ∧ -p_984) -> ( b^{328, 4}_2 ∧  b^{328, 4}_1 ∧ -b^{328, 4}_0)
c  in CNF:
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨  b^{328, 4}_2
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨  b^{328, 4}_1
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨  p_984 ∨ -b^{328, 4}_0
c  in DIMACS:
-23855  23856 -23857  984  23858 0
-23855  23856 -23857  984  23859 0
-23855  23856 -23857  984 -23860 0

c  -2-1 --> break 
c    ( b^{328, 3}_2 ∧  b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧ -p_984) -> break
c  in CNF:
c    -b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨  b^{328, 3}_0 ∨  p_984 ∨ break
c  in DIMACS:
-23855 -23856  23857  984 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{328, 3}_2 ∧ -b^{328, 3}_1 ∧ -b^{328, 3}_0 ∧ true) 
c  in CNF:
c    -b^{328, 3}_2 ∨  b^{328, 3}_1 ∨  b^{328, 3}_0 ∨ false 
c  in DIMACS:
-23855  23856  23857  0

c  3 does not represent an automaton state.
c    -(-b^{328, 3}_2 ∧  b^{328, 3}_1 ∧  b^{328, 3}_0 ∧ true) 
c  in CNF:
c     b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ false 
c  in DIMACS:
 23855 -23856 -23857  0
c  -3 does not represent an automaton state.
c    -( b^{328, 3}_2 ∧  b^{328, 3}_1 ∧  b^{328, 3}_0 ∧ true) 
c  in CNF:
c    -b^{328, 3}_2 ∨ -b^{328, 3}_1 ∨ -b^{328, 3}_0 ∨ false 
c  in DIMACS:
-23855 -23856 -23857  0

c INIT for k = 329
c    -b^{329, 1}_2
c    -b^{329, 1}_1
c    -b^{329, 1}_0
c  in DIMACS:
-23861 0
-23862 0
-23863 0

c Transitions for k = 329
c i = 1
c  -2+1 --> -1
c    ( b^{329, 1}_2 ∧  b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧  p_329) -> ( b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0)
c  in CNF:
c    -b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨  b^{329, 2}_2
c    -b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_1
c    -b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨  b^{329, 2}_0
c  in DIMACS:
-23861 -23862  23863 -329  23864 0
-23861 -23862  23863 -329 -23865 0
-23861 -23862  23863 -329  23866 0

c  -1+1 --> 0
c    ( b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧  b^{329, 1}_0 ∧  p_329) -> (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧ -b^{329, 2}_0)
c  in CNF:
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_2
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_1
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_0
c  in DIMACS:
-23861  23862 -23863 -329 -23864 0
-23861  23862 -23863 -329 -23865 0
-23861  23862 -23863 -329 -23866 0

c  0+1 --> 1
c    (-b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧  p_329) -> (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0)
c  in CNF:
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_2
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_1
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨  b^{329, 2}_0
c  in DIMACS:
 23861  23862  23863 -329 -23864 0
 23861  23862  23863 -329 -23865 0
 23861  23862  23863 -329  23866 0

c  1+1 --> 2
c    (-b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧  b^{329, 1}_0 ∧  p_329) -> (-b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0)
c  in CNF:
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_2
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨  b^{329, 2}_1
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ -p_329 ∨ -b^{329, 2}_0
c  in DIMACS:
 23861  23862 -23863 -329 -23864 0
 23861  23862 -23863 -329  23865 0
 23861  23862 -23863 -329 -23866 0

c  2+1 --> break 
c    (-b^{329, 1}_2 ∧  b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧  p_329) -> break
c  in CNF:
c     b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ -p_329 ∨ break
c  in DIMACS:
 23861 -23862  23863 -329 1162 0


c  2-1 --> 1
c    (-b^{329, 1}_2 ∧  b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧ -p_329) -> (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0)
c  in CNF:
c     b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_2
c     b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_1
c     b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨  b^{329, 2}_0
c  in DIMACS:
 23861 -23862  23863  329 -23864 0
 23861 -23862  23863  329 -23865 0
 23861 -23862  23863  329  23866 0

c  1-1 --> 0
c    (-b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧  b^{329, 1}_0 ∧ -p_329) -> (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧ -b^{329, 2}_0)
c  in CNF:
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_2
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_1
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_0
c  in DIMACS:
 23861  23862 -23863  329 -23864 0
 23861  23862 -23863  329 -23865 0
 23861  23862 -23863  329 -23866 0

c  0-1 --> -1
c    (-b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧ -p_329) -> ( b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0)
c  in CNF:
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨  b^{329, 2}_2
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_1
c     b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨  b^{329, 2}_0
c  in DIMACS:
 23861  23862  23863  329  23864 0
 23861  23862  23863  329 -23865 0
 23861  23862  23863  329  23866 0

c  -1-1 --> -2
c    ( b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧  b^{329, 1}_0 ∧ -p_329) -> ( b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0)
c  in CNF:
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨  b^{329, 2}_2
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨  b^{329, 2}_1
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨  p_329 ∨ -b^{329, 2}_0
c  in DIMACS:
-23861  23862 -23863  329  23864 0
-23861  23862 -23863  329  23865 0
-23861  23862 -23863  329 -23866 0

c  -2-1 --> break 
c    ( b^{329, 1}_2 ∧  b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧ -p_329) -> break
c  in CNF:
c    -b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨  b^{329, 1}_0 ∨  p_329 ∨ break
c  in DIMACS:
-23861 -23862  23863  329 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{329, 1}_2 ∧ -b^{329, 1}_1 ∧ -b^{329, 1}_0 ∧ true) 
c  in CNF:
c    -b^{329, 1}_2 ∨  b^{329, 1}_1 ∨  b^{329, 1}_0 ∨ false 
c  in DIMACS:
-23861  23862  23863  0

c  3 does not represent an automaton state.
c    -(-b^{329, 1}_2 ∧  b^{329, 1}_1 ∧  b^{329, 1}_0 ∧ true) 
c  in CNF:
c     b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ false 
c  in DIMACS:
 23861 -23862 -23863  0
c  -3 does not represent an automaton state.
c    -( b^{329, 1}_2 ∧  b^{329, 1}_1 ∧  b^{329, 1}_0 ∧ true) 
c  in CNF:
c    -b^{329, 1}_2 ∨ -b^{329, 1}_1 ∨ -b^{329, 1}_0 ∨ false 
c  in DIMACS:
-23861 -23862 -23863  0

c i = 2
c  -2+1 --> -1
c    ( b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧  p_658) -> ( b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0)
c  in CNF:
c    -b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨  b^{329, 3}_2
c    -b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_1
c    -b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨  b^{329, 3}_0
c  in DIMACS:
-23864 -23865  23866 -658  23867 0
-23864 -23865  23866 -658 -23868 0
-23864 -23865  23866 -658  23869 0

c  -1+1 --> 0
c    ( b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0 ∧  p_658) -> (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧ -b^{329, 3}_0)
c  in CNF:
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_2
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_1
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_0
c  in DIMACS:
-23864  23865 -23866 -658 -23867 0
-23864  23865 -23866 -658 -23868 0
-23864  23865 -23866 -658 -23869 0

c  0+1 --> 1
c    (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧  p_658) -> (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0)
c  in CNF:
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_2
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_1
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨  b^{329, 3}_0
c  in DIMACS:
 23864  23865  23866 -658 -23867 0
 23864  23865  23866 -658 -23868 0
 23864  23865  23866 -658  23869 0

c  1+1 --> 2
c    (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0 ∧  p_658) -> (-b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0)
c  in CNF:
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_2
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨  b^{329, 3}_1
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ -p_658 ∨ -b^{329, 3}_0
c  in DIMACS:
 23864  23865 -23866 -658 -23867 0
 23864  23865 -23866 -658  23868 0
 23864  23865 -23866 -658 -23869 0

c  2+1 --> break 
c    (-b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧  p_658) -> break
c  in CNF:
c     b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ -p_658 ∨ break
c  in DIMACS:
 23864 -23865  23866 -658 1162 0


c  2-1 --> 1
c    (-b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧ -p_658) -> (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0)
c  in CNF:
c     b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_2
c     b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_1
c     b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨  b^{329, 3}_0
c  in DIMACS:
 23864 -23865  23866  658 -23867 0
 23864 -23865  23866  658 -23868 0
 23864 -23865  23866  658  23869 0

c  1-1 --> 0
c    (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0 ∧ -p_658) -> (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧ -b^{329, 3}_0)
c  in CNF:
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_2
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_1
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_0
c  in DIMACS:
 23864  23865 -23866  658 -23867 0
 23864  23865 -23866  658 -23868 0
 23864  23865 -23866  658 -23869 0

c  0-1 --> -1
c    (-b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧ -p_658) -> ( b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0)
c  in CNF:
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨  b^{329, 3}_2
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_1
c     b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨  b^{329, 3}_0
c  in DIMACS:
 23864  23865  23866  658  23867 0
 23864  23865  23866  658 -23868 0
 23864  23865  23866  658  23869 0

c  -1-1 --> -2
c    ( b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧  b^{329, 2}_0 ∧ -p_658) -> ( b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0)
c  in CNF:
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨  b^{329, 3}_2
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨  b^{329, 3}_1
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨  p_658 ∨ -b^{329, 3}_0
c  in DIMACS:
-23864  23865 -23866  658  23867 0
-23864  23865 -23866  658  23868 0
-23864  23865 -23866  658 -23869 0

c  -2-1 --> break 
c    ( b^{329, 2}_2 ∧  b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧ -p_658) -> break
c  in CNF:
c    -b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨  b^{329, 2}_0 ∨  p_658 ∨ break
c  in DIMACS:
-23864 -23865  23866  658 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{329, 2}_2 ∧ -b^{329, 2}_1 ∧ -b^{329, 2}_0 ∧ true) 
c  in CNF:
c    -b^{329, 2}_2 ∨  b^{329, 2}_1 ∨  b^{329, 2}_0 ∨ false 
c  in DIMACS:
-23864  23865  23866  0

c  3 does not represent an automaton state.
c    -(-b^{329, 2}_2 ∧  b^{329, 2}_1 ∧  b^{329, 2}_0 ∧ true) 
c  in CNF:
c     b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ false 
c  in DIMACS:
 23864 -23865 -23866  0
c  -3 does not represent an automaton state.
c    -( b^{329, 2}_2 ∧  b^{329, 2}_1 ∧  b^{329, 2}_0 ∧ true) 
c  in CNF:
c    -b^{329, 2}_2 ∨ -b^{329, 2}_1 ∨ -b^{329, 2}_0 ∨ false 
c  in DIMACS:
-23864 -23865 -23866  0

c i = 3
c  -2+1 --> -1
c    ( b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧  p_987) -> ( b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧  b^{329, 4}_0)
c  in CNF:
c    -b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨  b^{329, 4}_2
c    -b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_1
c    -b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨  b^{329, 4}_0
c  in DIMACS:
-23867 -23868  23869 -987  23870 0
-23867 -23868  23869 -987 -23871 0
-23867 -23868  23869 -987  23872 0

c  -1+1 --> 0
c    ( b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0 ∧  p_987) -> (-b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧ -b^{329, 4}_0)
c  in CNF:
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_2
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_1
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_0
c  in DIMACS:
-23867  23868 -23869 -987 -23870 0
-23867  23868 -23869 -987 -23871 0
-23867  23868 -23869 -987 -23872 0

c  0+1 --> 1
c    (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧  p_987) -> (-b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧  b^{329, 4}_0)
c  in CNF:
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_2
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_1
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨  b^{329, 4}_0
c  in DIMACS:
 23867  23868  23869 -987 -23870 0
 23867  23868  23869 -987 -23871 0
 23867  23868  23869 -987  23872 0

c  1+1 --> 2
c    (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0 ∧  p_987) -> (-b^{329, 4}_2 ∧  b^{329, 4}_1 ∧ -b^{329, 4}_0)
c  in CNF:
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_2
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨  b^{329, 4}_1
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ -p_987 ∨ -b^{329, 4}_0
c  in DIMACS:
 23867  23868 -23869 -987 -23870 0
 23867  23868 -23869 -987  23871 0
 23867  23868 -23869 -987 -23872 0

c  2+1 --> break 
c    (-b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧  p_987) -> break
c  in CNF:
c     b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ -p_987 ∨ break
c  in DIMACS:
 23867 -23868  23869 -987 1162 0


c  2-1 --> 1
c    (-b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧ -p_987) -> (-b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧  b^{329, 4}_0)
c  in CNF:
c     b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_2
c     b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_1
c     b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨  b^{329, 4}_0
c  in DIMACS:
 23867 -23868  23869  987 -23870 0
 23867 -23868  23869  987 -23871 0
 23867 -23868  23869  987  23872 0

c  1-1 --> 0
c    (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0 ∧ -p_987) -> (-b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧ -b^{329, 4}_0)
c  in CNF:
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_2
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_1
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_0
c  in DIMACS:
 23867  23868 -23869  987 -23870 0
 23867  23868 -23869  987 -23871 0
 23867  23868 -23869  987 -23872 0

c  0-1 --> -1
c    (-b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧ -p_987) -> ( b^{329, 4}_2 ∧ -b^{329, 4}_1 ∧  b^{329, 4}_0)
c  in CNF:
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨  b^{329, 4}_2
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_1
c     b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨  b^{329, 4}_0
c  in DIMACS:
 23867  23868  23869  987  23870 0
 23867  23868  23869  987 -23871 0
 23867  23868  23869  987  23872 0

c  -1-1 --> -2
c    ( b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧  b^{329, 3}_0 ∧ -p_987) -> ( b^{329, 4}_2 ∧  b^{329, 4}_1 ∧ -b^{329, 4}_0)
c  in CNF:
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨  b^{329, 4}_2
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨  b^{329, 4}_1
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨  p_987 ∨ -b^{329, 4}_0
c  in DIMACS:
-23867  23868 -23869  987  23870 0
-23867  23868 -23869  987  23871 0
-23867  23868 -23869  987 -23872 0

c  -2-1 --> break 
c    ( b^{329, 3}_2 ∧  b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧ -p_987) -> break
c  in CNF:
c    -b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨  b^{329, 3}_0 ∨  p_987 ∨ break
c  in DIMACS:
-23867 -23868  23869  987 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{329, 3}_2 ∧ -b^{329, 3}_1 ∧ -b^{329, 3}_0 ∧ true) 
c  in CNF:
c    -b^{329, 3}_2 ∨  b^{329, 3}_1 ∨  b^{329, 3}_0 ∨ false 
c  in DIMACS:
-23867  23868  23869  0

c  3 does not represent an automaton state.
c    -(-b^{329, 3}_2 ∧  b^{329, 3}_1 ∧  b^{329, 3}_0 ∧ true) 
c  in CNF:
c     b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ false 
c  in DIMACS:
 23867 -23868 -23869  0
c  -3 does not represent an automaton state.
c    -( b^{329, 3}_2 ∧  b^{329, 3}_1 ∧  b^{329, 3}_0 ∧ true) 
c  in CNF:
c    -b^{329, 3}_2 ∨ -b^{329, 3}_1 ∨ -b^{329, 3}_0 ∨ false 
c  in DIMACS:
-23867 -23868 -23869  0

c INIT for k = 330
c    -b^{330, 1}_2
c    -b^{330, 1}_1
c    -b^{330, 1}_0
c  in DIMACS:
-23873 0
-23874 0
-23875 0

c Transitions for k = 330
c i = 1
c  -2+1 --> -1
c    ( b^{330, 1}_2 ∧  b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧  p_330) -> ( b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0)
c  in CNF:
c    -b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨  b^{330, 2}_2
c    -b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_1
c    -b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨  b^{330, 2}_0
c  in DIMACS:
-23873 -23874  23875 -330  23876 0
-23873 -23874  23875 -330 -23877 0
-23873 -23874  23875 -330  23878 0

c  -1+1 --> 0
c    ( b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧  b^{330, 1}_0 ∧  p_330) -> (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧ -b^{330, 2}_0)
c  in CNF:
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_2
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_1
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_0
c  in DIMACS:
-23873  23874 -23875 -330 -23876 0
-23873  23874 -23875 -330 -23877 0
-23873  23874 -23875 -330 -23878 0

c  0+1 --> 1
c    (-b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧  p_330) -> (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0)
c  in CNF:
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_2
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_1
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨  b^{330, 2}_0
c  in DIMACS:
 23873  23874  23875 -330 -23876 0
 23873  23874  23875 -330 -23877 0
 23873  23874  23875 -330  23878 0

c  1+1 --> 2
c    (-b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧  b^{330, 1}_0 ∧  p_330) -> (-b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0)
c  in CNF:
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_2
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨  b^{330, 2}_1
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ -p_330 ∨ -b^{330, 2}_0
c  in DIMACS:
 23873  23874 -23875 -330 -23876 0
 23873  23874 -23875 -330  23877 0
 23873  23874 -23875 -330 -23878 0

c  2+1 --> break 
c    (-b^{330, 1}_2 ∧  b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧  p_330) -> break
c  in CNF:
c     b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ -p_330 ∨ break
c  in DIMACS:
 23873 -23874  23875 -330 1162 0


c  2-1 --> 1
c    (-b^{330, 1}_2 ∧  b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧ -p_330) -> (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0)
c  in CNF:
c     b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_2
c     b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_1
c     b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨  b^{330, 2}_0
c  in DIMACS:
 23873 -23874  23875  330 -23876 0
 23873 -23874  23875  330 -23877 0
 23873 -23874  23875  330  23878 0

c  1-1 --> 0
c    (-b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧  b^{330, 1}_0 ∧ -p_330) -> (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧ -b^{330, 2}_0)
c  in CNF:
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_2
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_1
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_0
c  in DIMACS:
 23873  23874 -23875  330 -23876 0
 23873  23874 -23875  330 -23877 0
 23873  23874 -23875  330 -23878 0

c  0-1 --> -1
c    (-b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧ -p_330) -> ( b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0)
c  in CNF:
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨  b^{330, 2}_2
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_1
c     b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨  b^{330, 2}_0
c  in DIMACS:
 23873  23874  23875  330  23876 0
 23873  23874  23875  330 -23877 0
 23873  23874  23875  330  23878 0

c  -1-1 --> -2
c    ( b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧  b^{330, 1}_0 ∧ -p_330) -> ( b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0)
c  in CNF:
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨  b^{330, 2}_2
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨  b^{330, 2}_1
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨  p_330 ∨ -b^{330, 2}_0
c  in DIMACS:
-23873  23874 -23875  330  23876 0
-23873  23874 -23875  330  23877 0
-23873  23874 -23875  330 -23878 0

c  -2-1 --> break 
c    ( b^{330, 1}_2 ∧  b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧ -p_330) -> break
c  in CNF:
c    -b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨  b^{330, 1}_0 ∨  p_330 ∨ break
c  in DIMACS:
-23873 -23874  23875  330 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{330, 1}_2 ∧ -b^{330, 1}_1 ∧ -b^{330, 1}_0 ∧ true) 
c  in CNF:
c    -b^{330, 1}_2 ∨  b^{330, 1}_1 ∨  b^{330, 1}_0 ∨ false 
c  in DIMACS:
-23873  23874  23875  0

c  3 does not represent an automaton state.
c    -(-b^{330, 1}_2 ∧  b^{330, 1}_1 ∧  b^{330, 1}_0 ∧ true) 
c  in CNF:
c     b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ false 
c  in DIMACS:
 23873 -23874 -23875  0
c  -3 does not represent an automaton state.
c    -( b^{330, 1}_2 ∧  b^{330, 1}_1 ∧  b^{330, 1}_0 ∧ true) 
c  in CNF:
c    -b^{330, 1}_2 ∨ -b^{330, 1}_1 ∨ -b^{330, 1}_0 ∨ false 
c  in DIMACS:
-23873 -23874 -23875  0

c i = 2
c  -2+1 --> -1
c    ( b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧  p_660) -> ( b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0)
c  in CNF:
c    -b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨  b^{330, 3}_2
c    -b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_1
c    -b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨  b^{330, 3}_0
c  in DIMACS:
-23876 -23877  23878 -660  23879 0
-23876 -23877  23878 -660 -23880 0
-23876 -23877  23878 -660  23881 0

c  -1+1 --> 0
c    ( b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0 ∧  p_660) -> (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧ -b^{330, 3}_0)
c  in CNF:
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_2
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_1
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_0
c  in DIMACS:
-23876  23877 -23878 -660 -23879 0
-23876  23877 -23878 -660 -23880 0
-23876  23877 -23878 -660 -23881 0

c  0+1 --> 1
c    (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧  p_660) -> (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0)
c  in CNF:
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_2
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_1
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨  b^{330, 3}_0
c  in DIMACS:
 23876  23877  23878 -660 -23879 0
 23876  23877  23878 -660 -23880 0
 23876  23877  23878 -660  23881 0

c  1+1 --> 2
c    (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0 ∧  p_660) -> (-b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0)
c  in CNF:
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_2
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨  b^{330, 3}_1
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ -p_660 ∨ -b^{330, 3}_0
c  in DIMACS:
 23876  23877 -23878 -660 -23879 0
 23876  23877 -23878 -660  23880 0
 23876  23877 -23878 -660 -23881 0

c  2+1 --> break 
c    (-b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧  p_660) -> break
c  in CNF:
c     b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ -p_660 ∨ break
c  in DIMACS:
 23876 -23877  23878 -660 1162 0


c  2-1 --> 1
c    (-b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧ -p_660) -> (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0)
c  in CNF:
c     b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_2
c     b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_1
c     b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨  b^{330, 3}_0
c  in DIMACS:
 23876 -23877  23878  660 -23879 0
 23876 -23877  23878  660 -23880 0
 23876 -23877  23878  660  23881 0

c  1-1 --> 0
c    (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0 ∧ -p_660) -> (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧ -b^{330, 3}_0)
c  in CNF:
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_2
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_1
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_0
c  in DIMACS:
 23876  23877 -23878  660 -23879 0
 23876  23877 -23878  660 -23880 0
 23876  23877 -23878  660 -23881 0

c  0-1 --> -1
c    (-b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧ -p_660) -> ( b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0)
c  in CNF:
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨  b^{330, 3}_2
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_1
c     b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨  b^{330, 3}_0
c  in DIMACS:
 23876  23877  23878  660  23879 0
 23876  23877  23878  660 -23880 0
 23876  23877  23878  660  23881 0

c  -1-1 --> -2
c    ( b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧  b^{330, 2}_0 ∧ -p_660) -> ( b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0)
c  in CNF:
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨  b^{330, 3}_2
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨  b^{330, 3}_1
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨  p_660 ∨ -b^{330, 3}_0
c  in DIMACS:
-23876  23877 -23878  660  23879 0
-23876  23877 -23878  660  23880 0
-23876  23877 -23878  660 -23881 0

c  -2-1 --> break 
c    ( b^{330, 2}_2 ∧  b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧ -p_660) -> break
c  in CNF:
c    -b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨  b^{330, 2}_0 ∨  p_660 ∨ break
c  in DIMACS:
-23876 -23877  23878  660 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{330, 2}_2 ∧ -b^{330, 2}_1 ∧ -b^{330, 2}_0 ∧ true) 
c  in CNF:
c    -b^{330, 2}_2 ∨  b^{330, 2}_1 ∨  b^{330, 2}_0 ∨ false 
c  in DIMACS:
-23876  23877  23878  0

c  3 does not represent an automaton state.
c    -(-b^{330, 2}_2 ∧  b^{330, 2}_1 ∧  b^{330, 2}_0 ∧ true) 
c  in CNF:
c     b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ false 
c  in DIMACS:
 23876 -23877 -23878  0
c  -3 does not represent an automaton state.
c    -( b^{330, 2}_2 ∧  b^{330, 2}_1 ∧  b^{330, 2}_0 ∧ true) 
c  in CNF:
c    -b^{330, 2}_2 ∨ -b^{330, 2}_1 ∨ -b^{330, 2}_0 ∨ false 
c  in DIMACS:
-23876 -23877 -23878  0

c i = 3
c  -2+1 --> -1
c    ( b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧  p_990) -> ( b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧  b^{330, 4}_0)
c  in CNF:
c    -b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨  b^{330, 4}_2
c    -b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_1
c    -b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨  b^{330, 4}_0
c  in DIMACS:
-23879 -23880  23881 -990  23882 0
-23879 -23880  23881 -990 -23883 0
-23879 -23880  23881 -990  23884 0

c  -1+1 --> 0
c    ( b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0 ∧  p_990) -> (-b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧ -b^{330, 4}_0)
c  in CNF:
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_2
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_1
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_0
c  in DIMACS:
-23879  23880 -23881 -990 -23882 0
-23879  23880 -23881 -990 -23883 0
-23879  23880 -23881 -990 -23884 0

c  0+1 --> 1
c    (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧  p_990) -> (-b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧  b^{330, 4}_0)
c  in CNF:
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_2
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_1
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨  b^{330, 4}_0
c  in DIMACS:
 23879  23880  23881 -990 -23882 0
 23879  23880  23881 -990 -23883 0
 23879  23880  23881 -990  23884 0

c  1+1 --> 2
c    (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0 ∧  p_990) -> (-b^{330, 4}_2 ∧  b^{330, 4}_1 ∧ -b^{330, 4}_0)
c  in CNF:
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_2
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨  b^{330, 4}_1
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ -p_990 ∨ -b^{330, 4}_0
c  in DIMACS:
 23879  23880 -23881 -990 -23882 0
 23879  23880 -23881 -990  23883 0
 23879  23880 -23881 -990 -23884 0

c  2+1 --> break 
c    (-b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧  p_990) -> break
c  in CNF:
c     b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ -p_990 ∨ break
c  in DIMACS:
 23879 -23880  23881 -990 1162 0


c  2-1 --> 1
c    (-b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧ -p_990) -> (-b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧  b^{330, 4}_0)
c  in CNF:
c     b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_2
c     b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_1
c     b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨  b^{330, 4}_0
c  in DIMACS:
 23879 -23880  23881  990 -23882 0
 23879 -23880  23881  990 -23883 0
 23879 -23880  23881  990  23884 0

c  1-1 --> 0
c    (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0 ∧ -p_990) -> (-b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧ -b^{330, 4}_0)
c  in CNF:
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_2
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_1
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_0
c  in DIMACS:
 23879  23880 -23881  990 -23882 0
 23879  23880 -23881  990 -23883 0
 23879  23880 -23881  990 -23884 0

c  0-1 --> -1
c    (-b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧ -p_990) -> ( b^{330, 4}_2 ∧ -b^{330, 4}_1 ∧  b^{330, 4}_0)
c  in CNF:
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨  b^{330, 4}_2
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_1
c     b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨  b^{330, 4}_0
c  in DIMACS:
 23879  23880  23881  990  23882 0
 23879  23880  23881  990 -23883 0
 23879  23880  23881  990  23884 0

c  -1-1 --> -2
c    ( b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧  b^{330, 3}_0 ∧ -p_990) -> ( b^{330, 4}_2 ∧  b^{330, 4}_1 ∧ -b^{330, 4}_0)
c  in CNF:
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨  b^{330, 4}_2
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨  b^{330, 4}_1
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨  p_990 ∨ -b^{330, 4}_0
c  in DIMACS:
-23879  23880 -23881  990  23882 0
-23879  23880 -23881  990  23883 0
-23879  23880 -23881  990 -23884 0

c  -2-1 --> break 
c    ( b^{330, 3}_2 ∧  b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧ -p_990) -> break
c  in CNF:
c    -b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨  b^{330, 3}_0 ∨  p_990 ∨ break
c  in DIMACS:
-23879 -23880  23881  990 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{330, 3}_2 ∧ -b^{330, 3}_1 ∧ -b^{330, 3}_0 ∧ true) 
c  in CNF:
c    -b^{330, 3}_2 ∨  b^{330, 3}_1 ∨  b^{330, 3}_0 ∨ false 
c  in DIMACS:
-23879  23880  23881  0

c  3 does not represent an automaton state.
c    -(-b^{330, 3}_2 ∧  b^{330, 3}_1 ∧  b^{330, 3}_0 ∧ true) 
c  in CNF:
c     b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ false 
c  in DIMACS:
 23879 -23880 -23881  0
c  -3 does not represent an automaton state.
c    -( b^{330, 3}_2 ∧  b^{330, 3}_1 ∧  b^{330, 3}_0 ∧ true) 
c  in CNF:
c    -b^{330, 3}_2 ∨ -b^{330, 3}_1 ∨ -b^{330, 3}_0 ∨ false 
c  in DIMACS:
-23879 -23880 -23881  0

c INIT for k = 331
c    -b^{331, 1}_2
c    -b^{331, 1}_1
c    -b^{331, 1}_0
c  in DIMACS:
-23885 0
-23886 0
-23887 0

c Transitions for k = 331
c i = 1
c  -2+1 --> -1
c    ( b^{331, 1}_2 ∧  b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧  p_331) -> ( b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0)
c  in CNF:
c    -b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨  b^{331, 2}_2
c    -b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_1
c    -b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨  b^{331, 2}_0
c  in DIMACS:
-23885 -23886  23887 -331  23888 0
-23885 -23886  23887 -331 -23889 0
-23885 -23886  23887 -331  23890 0

c  -1+1 --> 0
c    ( b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧  b^{331, 1}_0 ∧  p_331) -> (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧ -b^{331, 2}_0)
c  in CNF:
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_2
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_1
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_0
c  in DIMACS:
-23885  23886 -23887 -331 -23888 0
-23885  23886 -23887 -331 -23889 0
-23885  23886 -23887 -331 -23890 0

c  0+1 --> 1
c    (-b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧  p_331) -> (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0)
c  in CNF:
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_2
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_1
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨  b^{331, 2}_0
c  in DIMACS:
 23885  23886  23887 -331 -23888 0
 23885  23886  23887 -331 -23889 0
 23885  23886  23887 -331  23890 0

c  1+1 --> 2
c    (-b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧  b^{331, 1}_0 ∧  p_331) -> (-b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0)
c  in CNF:
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_2
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨  b^{331, 2}_1
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ -p_331 ∨ -b^{331, 2}_0
c  in DIMACS:
 23885  23886 -23887 -331 -23888 0
 23885  23886 -23887 -331  23889 0
 23885  23886 -23887 -331 -23890 0

c  2+1 --> break 
c    (-b^{331, 1}_2 ∧  b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧  p_331) -> break
c  in CNF:
c     b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ -p_331 ∨ break
c  in DIMACS:
 23885 -23886  23887 -331 1162 0


c  2-1 --> 1
c    (-b^{331, 1}_2 ∧  b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧ -p_331) -> (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0)
c  in CNF:
c     b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_2
c     b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_1
c     b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨  b^{331, 2}_0
c  in DIMACS:
 23885 -23886  23887  331 -23888 0
 23885 -23886  23887  331 -23889 0
 23885 -23886  23887  331  23890 0

c  1-1 --> 0
c    (-b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧  b^{331, 1}_0 ∧ -p_331) -> (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧ -b^{331, 2}_0)
c  in CNF:
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_2
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_1
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_0
c  in DIMACS:
 23885  23886 -23887  331 -23888 0
 23885  23886 -23887  331 -23889 0
 23885  23886 -23887  331 -23890 0

c  0-1 --> -1
c    (-b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧ -p_331) -> ( b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0)
c  in CNF:
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨  b^{331, 2}_2
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_1
c     b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨  b^{331, 2}_0
c  in DIMACS:
 23885  23886  23887  331  23888 0
 23885  23886  23887  331 -23889 0
 23885  23886  23887  331  23890 0

c  -1-1 --> -2
c    ( b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧  b^{331, 1}_0 ∧ -p_331) -> ( b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0)
c  in CNF:
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨  b^{331, 2}_2
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨  b^{331, 2}_1
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨  p_331 ∨ -b^{331, 2}_0
c  in DIMACS:
-23885  23886 -23887  331  23888 0
-23885  23886 -23887  331  23889 0
-23885  23886 -23887  331 -23890 0

c  -2-1 --> break 
c    ( b^{331, 1}_2 ∧  b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧ -p_331) -> break
c  in CNF:
c    -b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨  b^{331, 1}_0 ∨  p_331 ∨ break
c  in DIMACS:
-23885 -23886  23887  331 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{331, 1}_2 ∧ -b^{331, 1}_1 ∧ -b^{331, 1}_0 ∧ true) 
c  in CNF:
c    -b^{331, 1}_2 ∨  b^{331, 1}_1 ∨  b^{331, 1}_0 ∨ false 
c  in DIMACS:
-23885  23886  23887  0

c  3 does not represent an automaton state.
c    -(-b^{331, 1}_2 ∧  b^{331, 1}_1 ∧  b^{331, 1}_0 ∧ true) 
c  in CNF:
c     b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ false 
c  in DIMACS:
 23885 -23886 -23887  0
c  -3 does not represent an automaton state.
c    -( b^{331, 1}_2 ∧  b^{331, 1}_1 ∧  b^{331, 1}_0 ∧ true) 
c  in CNF:
c    -b^{331, 1}_2 ∨ -b^{331, 1}_1 ∨ -b^{331, 1}_0 ∨ false 
c  in DIMACS:
-23885 -23886 -23887  0

c i = 2
c  -2+1 --> -1
c    ( b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧  p_662) -> ( b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0)
c  in CNF:
c    -b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨  b^{331, 3}_2
c    -b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_1
c    -b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨  b^{331, 3}_0
c  in DIMACS:
-23888 -23889  23890 -662  23891 0
-23888 -23889  23890 -662 -23892 0
-23888 -23889  23890 -662  23893 0

c  -1+1 --> 0
c    ( b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0 ∧  p_662) -> (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧ -b^{331, 3}_0)
c  in CNF:
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_2
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_1
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_0
c  in DIMACS:
-23888  23889 -23890 -662 -23891 0
-23888  23889 -23890 -662 -23892 0
-23888  23889 -23890 -662 -23893 0

c  0+1 --> 1
c    (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧  p_662) -> (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0)
c  in CNF:
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_2
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_1
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨  b^{331, 3}_0
c  in DIMACS:
 23888  23889  23890 -662 -23891 0
 23888  23889  23890 -662 -23892 0
 23888  23889  23890 -662  23893 0

c  1+1 --> 2
c    (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0 ∧  p_662) -> (-b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0)
c  in CNF:
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_2
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨  b^{331, 3}_1
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ -p_662 ∨ -b^{331, 3}_0
c  in DIMACS:
 23888  23889 -23890 -662 -23891 0
 23888  23889 -23890 -662  23892 0
 23888  23889 -23890 -662 -23893 0

c  2+1 --> break 
c    (-b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧  p_662) -> break
c  in CNF:
c     b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ -p_662 ∨ break
c  in DIMACS:
 23888 -23889  23890 -662 1162 0


c  2-1 --> 1
c    (-b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧ -p_662) -> (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0)
c  in CNF:
c     b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_2
c     b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_1
c     b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨  b^{331, 3}_0
c  in DIMACS:
 23888 -23889  23890  662 -23891 0
 23888 -23889  23890  662 -23892 0
 23888 -23889  23890  662  23893 0

c  1-1 --> 0
c    (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0 ∧ -p_662) -> (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧ -b^{331, 3}_0)
c  in CNF:
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_2
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_1
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_0
c  in DIMACS:
 23888  23889 -23890  662 -23891 0
 23888  23889 -23890  662 -23892 0
 23888  23889 -23890  662 -23893 0

c  0-1 --> -1
c    (-b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧ -p_662) -> ( b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0)
c  in CNF:
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨  b^{331, 3}_2
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_1
c     b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨  b^{331, 3}_0
c  in DIMACS:
 23888  23889  23890  662  23891 0
 23888  23889  23890  662 -23892 0
 23888  23889  23890  662  23893 0

c  -1-1 --> -2
c    ( b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧  b^{331, 2}_0 ∧ -p_662) -> ( b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0)
c  in CNF:
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨  b^{331, 3}_2
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨  b^{331, 3}_1
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨  p_662 ∨ -b^{331, 3}_0
c  in DIMACS:
-23888  23889 -23890  662  23891 0
-23888  23889 -23890  662  23892 0
-23888  23889 -23890  662 -23893 0

c  -2-1 --> break 
c    ( b^{331, 2}_2 ∧  b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧ -p_662) -> break
c  in CNF:
c    -b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨  b^{331, 2}_0 ∨  p_662 ∨ break
c  in DIMACS:
-23888 -23889  23890  662 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{331, 2}_2 ∧ -b^{331, 2}_1 ∧ -b^{331, 2}_0 ∧ true) 
c  in CNF:
c    -b^{331, 2}_2 ∨  b^{331, 2}_1 ∨  b^{331, 2}_0 ∨ false 
c  in DIMACS:
-23888  23889  23890  0

c  3 does not represent an automaton state.
c    -(-b^{331, 2}_2 ∧  b^{331, 2}_1 ∧  b^{331, 2}_0 ∧ true) 
c  in CNF:
c     b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ false 
c  in DIMACS:
 23888 -23889 -23890  0
c  -3 does not represent an automaton state.
c    -( b^{331, 2}_2 ∧  b^{331, 2}_1 ∧  b^{331, 2}_0 ∧ true) 
c  in CNF:
c    -b^{331, 2}_2 ∨ -b^{331, 2}_1 ∨ -b^{331, 2}_0 ∨ false 
c  in DIMACS:
-23888 -23889 -23890  0

c i = 3
c  -2+1 --> -1
c    ( b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧  p_993) -> ( b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧  b^{331, 4}_0)
c  in CNF:
c    -b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨  b^{331, 4}_2
c    -b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_1
c    -b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨  b^{331, 4}_0
c  in DIMACS:
-23891 -23892  23893 -993  23894 0
-23891 -23892  23893 -993 -23895 0
-23891 -23892  23893 -993  23896 0

c  -1+1 --> 0
c    ( b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0 ∧  p_993) -> (-b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧ -b^{331, 4}_0)
c  in CNF:
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_2
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_1
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_0
c  in DIMACS:
-23891  23892 -23893 -993 -23894 0
-23891  23892 -23893 -993 -23895 0
-23891  23892 -23893 -993 -23896 0

c  0+1 --> 1
c    (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧  p_993) -> (-b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧  b^{331, 4}_0)
c  in CNF:
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_2
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_1
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨  b^{331, 4}_0
c  in DIMACS:
 23891  23892  23893 -993 -23894 0
 23891  23892  23893 -993 -23895 0
 23891  23892  23893 -993  23896 0

c  1+1 --> 2
c    (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0 ∧  p_993) -> (-b^{331, 4}_2 ∧  b^{331, 4}_1 ∧ -b^{331, 4}_0)
c  in CNF:
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_2
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨  b^{331, 4}_1
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ -p_993 ∨ -b^{331, 4}_0
c  in DIMACS:
 23891  23892 -23893 -993 -23894 0
 23891  23892 -23893 -993  23895 0
 23891  23892 -23893 -993 -23896 0

c  2+1 --> break 
c    (-b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧  p_993) -> break
c  in CNF:
c     b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ -p_993 ∨ break
c  in DIMACS:
 23891 -23892  23893 -993 1162 0


c  2-1 --> 1
c    (-b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧ -p_993) -> (-b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧  b^{331, 4}_0)
c  in CNF:
c     b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_2
c     b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_1
c     b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨  b^{331, 4}_0
c  in DIMACS:
 23891 -23892  23893  993 -23894 0
 23891 -23892  23893  993 -23895 0
 23891 -23892  23893  993  23896 0

c  1-1 --> 0
c    (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0 ∧ -p_993) -> (-b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧ -b^{331, 4}_0)
c  in CNF:
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_2
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_1
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_0
c  in DIMACS:
 23891  23892 -23893  993 -23894 0
 23891  23892 -23893  993 -23895 0
 23891  23892 -23893  993 -23896 0

c  0-1 --> -1
c    (-b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧ -p_993) -> ( b^{331, 4}_2 ∧ -b^{331, 4}_1 ∧  b^{331, 4}_0)
c  in CNF:
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨  b^{331, 4}_2
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_1
c     b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨  b^{331, 4}_0
c  in DIMACS:
 23891  23892  23893  993  23894 0
 23891  23892  23893  993 -23895 0
 23891  23892  23893  993  23896 0

c  -1-1 --> -2
c    ( b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧  b^{331, 3}_0 ∧ -p_993) -> ( b^{331, 4}_2 ∧  b^{331, 4}_1 ∧ -b^{331, 4}_0)
c  in CNF:
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨  b^{331, 4}_2
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨  b^{331, 4}_1
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨  p_993 ∨ -b^{331, 4}_0
c  in DIMACS:
-23891  23892 -23893  993  23894 0
-23891  23892 -23893  993  23895 0
-23891  23892 -23893  993 -23896 0

c  -2-1 --> break 
c    ( b^{331, 3}_2 ∧  b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧ -p_993) -> break
c  in CNF:
c    -b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨  b^{331, 3}_0 ∨  p_993 ∨ break
c  in DIMACS:
-23891 -23892  23893  993 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{331, 3}_2 ∧ -b^{331, 3}_1 ∧ -b^{331, 3}_0 ∧ true) 
c  in CNF:
c    -b^{331, 3}_2 ∨  b^{331, 3}_1 ∨  b^{331, 3}_0 ∨ false 
c  in DIMACS:
-23891  23892  23893  0

c  3 does not represent an automaton state.
c    -(-b^{331, 3}_2 ∧  b^{331, 3}_1 ∧  b^{331, 3}_0 ∧ true) 
c  in CNF:
c     b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ false 
c  in DIMACS:
 23891 -23892 -23893  0
c  -3 does not represent an automaton state.
c    -( b^{331, 3}_2 ∧  b^{331, 3}_1 ∧  b^{331, 3}_0 ∧ true) 
c  in CNF:
c    -b^{331, 3}_2 ∨ -b^{331, 3}_1 ∨ -b^{331, 3}_0 ∨ false 
c  in DIMACS:
-23891 -23892 -23893  0

c INIT for k = 332
c    -b^{332, 1}_2
c    -b^{332, 1}_1
c    -b^{332, 1}_0
c  in DIMACS:
-23897 0
-23898 0
-23899 0

c Transitions for k = 332
c i = 1
c  -2+1 --> -1
c    ( b^{332, 1}_2 ∧  b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧  p_332) -> ( b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0)
c  in CNF:
c    -b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨  b^{332, 2}_2
c    -b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_1
c    -b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨  b^{332, 2}_0
c  in DIMACS:
-23897 -23898  23899 -332  23900 0
-23897 -23898  23899 -332 -23901 0
-23897 -23898  23899 -332  23902 0

c  -1+1 --> 0
c    ( b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧  b^{332, 1}_0 ∧  p_332) -> (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧ -b^{332, 2}_0)
c  in CNF:
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_2
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_1
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_0
c  in DIMACS:
-23897  23898 -23899 -332 -23900 0
-23897  23898 -23899 -332 -23901 0
-23897  23898 -23899 -332 -23902 0

c  0+1 --> 1
c    (-b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧  p_332) -> (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0)
c  in CNF:
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_2
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_1
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨  b^{332, 2}_0
c  in DIMACS:
 23897  23898  23899 -332 -23900 0
 23897  23898  23899 -332 -23901 0
 23897  23898  23899 -332  23902 0

c  1+1 --> 2
c    (-b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧  b^{332, 1}_0 ∧  p_332) -> (-b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0)
c  in CNF:
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_2
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨  b^{332, 2}_1
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ -p_332 ∨ -b^{332, 2}_0
c  in DIMACS:
 23897  23898 -23899 -332 -23900 0
 23897  23898 -23899 -332  23901 0
 23897  23898 -23899 -332 -23902 0

c  2+1 --> break 
c    (-b^{332, 1}_2 ∧  b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧  p_332) -> break
c  in CNF:
c     b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ -p_332 ∨ break
c  in DIMACS:
 23897 -23898  23899 -332 1162 0


c  2-1 --> 1
c    (-b^{332, 1}_2 ∧  b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧ -p_332) -> (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0)
c  in CNF:
c     b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_2
c     b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_1
c     b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨  b^{332, 2}_0
c  in DIMACS:
 23897 -23898  23899  332 -23900 0
 23897 -23898  23899  332 -23901 0
 23897 -23898  23899  332  23902 0

c  1-1 --> 0
c    (-b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧  b^{332, 1}_0 ∧ -p_332) -> (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧ -b^{332, 2}_0)
c  in CNF:
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_2
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_1
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_0
c  in DIMACS:
 23897  23898 -23899  332 -23900 0
 23897  23898 -23899  332 -23901 0
 23897  23898 -23899  332 -23902 0

c  0-1 --> -1
c    (-b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧ -p_332) -> ( b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0)
c  in CNF:
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨  b^{332, 2}_2
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_1
c     b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨  b^{332, 2}_0
c  in DIMACS:
 23897  23898  23899  332  23900 0
 23897  23898  23899  332 -23901 0
 23897  23898  23899  332  23902 0

c  -1-1 --> -2
c    ( b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧  b^{332, 1}_0 ∧ -p_332) -> ( b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0)
c  in CNF:
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨  b^{332, 2}_2
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨  b^{332, 2}_1
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨  p_332 ∨ -b^{332, 2}_0
c  in DIMACS:
-23897  23898 -23899  332  23900 0
-23897  23898 -23899  332  23901 0
-23897  23898 -23899  332 -23902 0

c  -2-1 --> break 
c    ( b^{332, 1}_2 ∧  b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧ -p_332) -> break
c  in CNF:
c    -b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨  b^{332, 1}_0 ∨  p_332 ∨ break
c  in DIMACS:
-23897 -23898  23899  332 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{332, 1}_2 ∧ -b^{332, 1}_1 ∧ -b^{332, 1}_0 ∧ true) 
c  in CNF:
c    -b^{332, 1}_2 ∨  b^{332, 1}_1 ∨  b^{332, 1}_0 ∨ false 
c  in DIMACS:
-23897  23898  23899  0

c  3 does not represent an automaton state.
c    -(-b^{332, 1}_2 ∧  b^{332, 1}_1 ∧  b^{332, 1}_0 ∧ true) 
c  in CNF:
c     b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ false 
c  in DIMACS:
 23897 -23898 -23899  0
c  -3 does not represent an automaton state.
c    -( b^{332, 1}_2 ∧  b^{332, 1}_1 ∧  b^{332, 1}_0 ∧ true) 
c  in CNF:
c    -b^{332, 1}_2 ∨ -b^{332, 1}_1 ∨ -b^{332, 1}_0 ∨ false 
c  in DIMACS:
-23897 -23898 -23899  0

c i = 2
c  -2+1 --> -1
c    ( b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧  p_664) -> ( b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0)
c  in CNF:
c    -b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨  b^{332, 3}_2
c    -b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_1
c    -b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨  b^{332, 3}_0
c  in DIMACS:
-23900 -23901  23902 -664  23903 0
-23900 -23901  23902 -664 -23904 0
-23900 -23901  23902 -664  23905 0

c  -1+1 --> 0
c    ( b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0 ∧  p_664) -> (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧ -b^{332, 3}_0)
c  in CNF:
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_2
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_1
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_0
c  in DIMACS:
-23900  23901 -23902 -664 -23903 0
-23900  23901 -23902 -664 -23904 0
-23900  23901 -23902 -664 -23905 0

c  0+1 --> 1
c    (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧  p_664) -> (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0)
c  in CNF:
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_2
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_1
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨  b^{332, 3}_0
c  in DIMACS:
 23900  23901  23902 -664 -23903 0
 23900  23901  23902 -664 -23904 0
 23900  23901  23902 -664  23905 0

c  1+1 --> 2
c    (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0 ∧  p_664) -> (-b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0)
c  in CNF:
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_2
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨  b^{332, 3}_1
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ -p_664 ∨ -b^{332, 3}_0
c  in DIMACS:
 23900  23901 -23902 -664 -23903 0
 23900  23901 -23902 -664  23904 0
 23900  23901 -23902 -664 -23905 0

c  2+1 --> break 
c    (-b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧  p_664) -> break
c  in CNF:
c     b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ -p_664 ∨ break
c  in DIMACS:
 23900 -23901  23902 -664 1162 0


c  2-1 --> 1
c    (-b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧ -p_664) -> (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0)
c  in CNF:
c     b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_2
c     b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_1
c     b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨  b^{332, 3}_0
c  in DIMACS:
 23900 -23901  23902  664 -23903 0
 23900 -23901  23902  664 -23904 0
 23900 -23901  23902  664  23905 0

c  1-1 --> 0
c    (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0 ∧ -p_664) -> (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧ -b^{332, 3}_0)
c  in CNF:
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_2
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_1
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_0
c  in DIMACS:
 23900  23901 -23902  664 -23903 0
 23900  23901 -23902  664 -23904 0
 23900  23901 -23902  664 -23905 0

c  0-1 --> -1
c    (-b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧ -p_664) -> ( b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0)
c  in CNF:
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨  b^{332, 3}_2
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_1
c     b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨  b^{332, 3}_0
c  in DIMACS:
 23900  23901  23902  664  23903 0
 23900  23901  23902  664 -23904 0
 23900  23901  23902  664  23905 0

c  -1-1 --> -2
c    ( b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧  b^{332, 2}_0 ∧ -p_664) -> ( b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0)
c  in CNF:
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨  b^{332, 3}_2
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨  b^{332, 3}_1
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨  p_664 ∨ -b^{332, 3}_0
c  in DIMACS:
-23900  23901 -23902  664  23903 0
-23900  23901 -23902  664  23904 0
-23900  23901 -23902  664 -23905 0

c  -2-1 --> break 
c    ( b^{332, 2}_2 ∧  b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧ -p_664) -> break
c  in CNF:
c    -b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨  b^{332, 2}_0 ∨  p_664 ∨ break
c  in DIMACS:
-23900 -23901  23902  664 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{332, 2}_2 ∧ -b^{332, 2}_1 ∧ -b^{332, 2}_0 ∧ true) 
c  in CNF:
c    -b^{332, 2}_2 ∨  b^{332, 2}_1 ∨  b^{332, 2}_0 ∨ false 
c  in DIMACS:
-23900  23901  23902  0

c  3 does not represent an automaton state.
c    -(-b^{332, 2}_2 ∧  b^{332, 2}_1 ∧  b^{332, 2}_0 ∧ true) 
c  in CNF:
c     b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ false 
c  in DIMACS:
 23900 -23901 -23902  0
c  -3 does not represent an automaton state.
c    -( b^{332, 2}_2 ∧  b^{332, 2}_1 ∧  b^{332, 2}_0 ∧ true) 
c  in CNF:
c    -b^{332, 2}_2 ∨ -b^{332, 2}_1 ∨ -b^{332, 2}_0 ∨ false 
c  in DIMACS:
-23900 -23901 -23902  0

c i = 3
c  -2+1 --> -1
c    ( b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧  p_996) -> ( b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧  b^{332, 4}_0)
c  in CNF:
c    -b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨  b^{332, 4}_2
c    -b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_1
c    -b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨  b^{332, 4}_0
c  in DIMACS:
-23903 -23904  23905 -996  23906 0
-23903 -23904  23905 -996 -23907 0
-23903 -23904  23905 -996  23908 0

c  -1+1 --> 0
c    ( b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0 ∧  p_996) -> (-b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧ -b^{332, 4}_0)
c  in CNF:
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_2
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_1
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_0
c  in DIMACS:
-23903  23904 -23905 -996 -23906 0
-23903  23904 -23905 -996 -23907 0
-23903  23904 -23905 -996 -23908 0

c  0+1 --> 1
c    (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧  p_996) -> (-b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧  b^{332, 4}_0)
c  in CNF:
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_2
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_1
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨  b^{332, 4}_0
c  in DIMACS:
 23903  23904  23905 -996 -23906 0
 23903  23904  23905 -996 -23907 0
 23903  23904  23905 -996  23908 0

c  1+1 --> 2
c    (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0 ∧  p_996) -> (-b^{332, 4}_2 ∧  b^{332, 4}_1 ∧ -b^{332, 4}_0)
c  in CNF:
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_2
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨  b^{332, 4}_1
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ -p_996 ∨ -b^{332, 4}_0
c  in DIMACS:
 23903  23904 -23905 -996 -23906 0
 23903  23904 -23905 -996  23907 0
 23903  23904 -23905 -996 -23908 0

c  2+1 --> break 
c    (-b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧  p_996) -> break
c  in CNF:
c     b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ -p_996 ∨ break
c  in DIMACS:
 23903 -23904  23905 -996 1162 0


c  2-1 --> 1
c    (-b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧ -p_996) -> (-b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧  b^{332, 4}_0)
c  in CNF:
c     b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_2
c     b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_1
c     b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨  b^{332, 4}_0
c  in DIMACS:
 23903 -23904  23905  996 -23906 0
 23903 -23904  23905  996 -23907 0
 23903 -23904  23905  996  23908 0

c  1-1 --> 0
c    (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0 ∧ -p_996) -> (-b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧ -b^{332, 4}_0)
c  in CNF:
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_2
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_1
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_0
c  in DIMACS:
 23903  23904 -23905  996 -23906 0
 23903  23904 -23905  996 -23907 0
 23903  23904 -23905  996 -23908 0

c  0-1 --> -1
c    (-b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧ -p_996) -> ( b^{332, 4}_2 ∧ -b^{332, 4}_1 ∧  b^{332, 4}_0)
c  in CNF:
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨  b^{332, 4}_2
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_1
c     b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨  b^{332, 4}_0
c  in DIMACS:
 23903  23904  23905  996  23906 0
 23903  23904  23905  996 -23907 0
 23903  23904  23905  996  23908 0

c  -1-1 --> -2
c    ( b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧  b^{332, 3}_0 ∧ -p_996) -> ( b^{332, 4}_2 ∧  b^{332, 4}_1 ∧ -b^{332, 4}_0)
c  in CNF:
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨  b^{332, 4}_2
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨  b^{332, 4}_1
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨  p_996 ∨ -b^{332, 4}_0
c  in DIMACS:
-23903  23904 -23905  996  23906 0
-23903  23904 -23905  996  23907 0
-23903  23904 -23905  996 -23908 0

c  -2-1 --> break 
c    ( b^{332, 3}_2 ∧  b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧ -p_996) -> break
c  in CNF:
c    -b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨  b^{332, 3}_0 ∨  p_996 ∨ break
c  in DIMACS:
-23903 -23904  23905  996 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{332, 3}_2 ∧ -b^{332, 3}_1 ∧ -b^{332, 3}_0 ∧ true) 
c  in CNF:
c    -b^{332, 3}_2 ∨  b^{332, 3}_1 ∨  b^{332, 3}_0 ∨ false 
c  in DIMACS:
-23903  23904  23905  0

c  3 does not represent an automaton state.
c    -(-b^{332, 3}_2 ∧  b^{332, 3}_1 ∧  b^{332, 3}_0 ∧ true) 
c  in CNF:
c     b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ false 
c  in DIMACS:
 23903 -23904 -23905  0
c  -3 does not represent an automaton state.
c    -( b^{332, 3}_2 ∧  b^{332, 3}_1 ∧  b^{332, 3}_0 ∧ true) 
c  in CNF:
c    -b^{332, 3}_2 ∨ -b^{332, 3}_1 ∨ -b^{332, 3}_0 ∨ false 
c  in DIMACS:
-23903 -23904 -23905  0

c INIT for k = 333
c    -b^{333, 1}_2
c    -b^{333, 1}_1
c    -b^{333, 1}_0
c  in DIMACS:
-23909 0
-23910 0
-23911 0

c Transitions for k = 333
c i = 1
c  -2+1 --> -1
c    ( b^{333, 1}_2 ∧  b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧  p_333) -> ( b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0)
c  in CNF:
c    -b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨  b^{333, 2}_2
c    -b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_1
c    -b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨  b^{333, 2}_0
c  in DIMACS:
-23909 -23910  23911 -333  23912 0
-23909 -23910  23911 -333 -23913 0
-23909 -23910  23911 -333  23914 0

c  -1+1 --> 0
c    ( b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧  b^{333, 1}_0 ∧  p_333) -> (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧ -b^{333, 2}_0)
c  in CNF:
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_2
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_1
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_0
c  in DIMACS:
-23909  23910 -23911 -333 -23912 0
-23909  23910 -23911 -333 -23913 0
-23909  23910 -23911 -333 -23914 0

c  0+1 --> 1
c    (-b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧  p_333) -> (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0)
c  in CNF:
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_2
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_1
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨  b^{333, 2}_0
c  in DIMACS:
 23909  23910  23911 -333 -23912 0
 23909  23910  23911 -333 -23913 0
 23909  23910  23911 -333  23914 0

c  1+1 --> 2
c    (-b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧  b^{333, 1}_0 ∧  p_333) -> (-b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0)
c  in CNF:
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_2
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨  b^{333, 2}_1
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ -p_333 ∨ -b^{333, 2}_0
c  in DIMACS:
 23909  23910 -23911 -333 -23912 0
 23909  23910 -23911 -333  23913 0
 23909  23910 -23911 -333 -23914 0

c  2+1 --> break 
c    (-b^{333, 1}_2 ∧  b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧  p_333) -> break
c  in CNF:
c     b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ -p_333 ∨ break
c  in DIMACS:
 23909 -23910  23911 -333 1162 0


c  2-1 --> 1
c    (-b^{333, 1}_2 ∧  b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧ -p_333) -> (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0)
c  in CNF:
c     b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_2
c     b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_1
c     b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨  b^{333, 2}_0
c  in DIMACS:
 23909 -23910  23911  333 -23912 0
 23909 -23910  23911  333 -23913 0
 23909 -23910  23911  333  23914 0

c  1-1 --> 0
c    (-b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧  b^{333, 1}_0 ∧ -p_333) -> (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧ -b^{333, 2}_0)
c  in CNF:
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_2
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_1
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_0
c  in DIMACS:
 23909  23910 -23911  333 -23912 0
 23909  23910 -23911  333 -23913 0
 23909  23910 -23911  333 -23914 0

c  0-1 --> -1
c    (-b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧ -p_333) -> ( b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0)
c  in CNF:
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨  b^{333, 2}_2
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_1
c     b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨  b^{333, 2}_0
c  in DIMACS:
 23909  23910  23911  333  23912 0
 23909  23910  23911  333 -23913 0
 23909  23910  23911  333  23914 0

c  -1-1 --> -2
c    ( b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧  b^{333, 1}_0 ∧ -p_333) -> ( b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0)
c  in CNF:
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨  b^{333, 2}_2
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨  b^{333, 2}_1
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨  p_333 ∨ -b^{333, 2}_0
c  in DIMACS:
-23909  23910 -23911  333  23912 0
-23909  23910 -23911  333  23913 0
-23909  23910 -23911  333 -23914 0

c  -2-1 --> break 
c    ( b^{333, 1}_2 ∧  b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧ -p_333) -> break
c  in CNF:
c    -b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨  b^{333, 1}_0 ∨  p_333 ∨ break
c  in DIMACS:
-23909 -23910  23911  333 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{333, 1}_2 ∧ -b^{333, 1}_1 ∧ -b^{333, 1}_0 ∧ true) 
c  in CNF:
c    -b^{333, 1}_2 ∨  b^{333, 1}_1 ∨  b^{333, 1}_0 ∨ false 
c  in DIMACS:
-23909  23910  23911  0

c  3 does not represent an automaton state.
c    -(-b^{333, 1}_2 ∧  b^{333, 1}_1 ∧  b^{333, 1}_0 ∧ true) 
c  in CNF:
c     b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ false 
c  in DIMACS:
 23909 -23910 -23911  0
c  -3 does not represent an automaton state.
c    -( b^{333, 1}_2 ∧  b^{333, 1}_1 ∧  b^{333, 1}_0 ∧ true) 
c  in CNF:
c    -b^{333, 1}_2 ∨ -b^{333, 1}_1 ∨ -b^{333, 1}_0 ∨ false 
c  in DIMACS:
-23909 -23910 -23911  0

c i = 2
c  -2+1 --> -1
c    ( b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧  p_666) -> ( b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0)
c  in CNF:
c    -b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨  b^{333, 3}_2
c    -b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_1
c    -b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨  b^{333, 3}_0
c  in DIMACS:
-23912 -23913  23914 -666  23915 0
-23912 -23913  23914 -666 -23916 0
-23912 -23913  23914 -666  23917 0

c  -1+1 --> 0
c    ( b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0 ∧  p_666) -> (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧ -b^{333, 3}_0)
c  in CNF:
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_2
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_1
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_0
c  in DIMACS:
-23912  23913 -23914 -666 -23915 0
-23912  23913 -23914 -666 -23916 0
-23912  23913 -23914 -666 -23917 0

c  0+1 --> 1
c    (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧  p_666) -> (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0)
c  in CNF:
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_2
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_1
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨  b^{333, 3}_0
c  in DIMACS:
 23912  23913  23914 -666 -23915 0
 23912  23913  23914 -666 -23916 0
 23912  23913  23914 -666  23917 0

c  1+1 --> 2
c    (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0 ∧  p_666) -> (-b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0)
c  in CNF:
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_2
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨  b^{333, 3}_1
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ -p_666 ∨ -b^{333, 3}_0
c  in DIMACS:
 23912  23913 -23914 -666 -23915 0
 23912  23913 -23914 -666  23916 0
 23912  23913 -23914 -666 -23917 0

c  2+1 --> break 
c    (-b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧  p_666) -> break
c  in CNF:
c     b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ -p_666 ∨ break
c  in DIMACS:
 23912 -23913  23914 -666 1162 0


c  2-1 --> 1
c    (-b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧ -p_666) -> (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0)
c  in CNF:
c     b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_2
c     b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_1
c     b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨  b^{333, 3}_0
c  in DIMACS:
 23912 -23913  23914  666 -23915 0
 23912 -23913  23914  666 -23916 0
 23912 -23913  23914  666  23917 0

c  1-1 --> 0
c    (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0 ∧ -p_666) -> (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧ -b^{333, 3}_0)
c  in CNF:
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_2
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_1
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_0
c  in DIMACS:
 23912  23913 -23914  666 -23915 0
 23912  23913 -23914  666 -23916 0
 23912  23913 -23914  666 -23917 0

c  0-1 --> -1
c    (-b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧ -p_666) -> ( b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0)
c  in CNF:
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨  b^{333, 3}_2
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_1
c     b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨  b^{333, 3}_0
c  in DIMACS:
 23912  23913  23914  666  23915 0
 23912  23913  23914  666 -23916 0
 23912  23913  23914  666  23917 0

c  -1-1 --> -2
c    ( b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧  b^{333, 2}_0 ∧ -p_666) -> ( b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0)
c  in CNF:
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨  b^{333, 3}_2
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨  b^{333, 3}_1
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨  p_666 ∨ -b^{333, 3}_0
c  in DIMACS:
-23912  23913 -23914  666  23915 0
-23912  23913 -23914  666  23916 0
-23912  23913 -23914  666 -23917 0

c  -2-1 --> break 
c    ( b^{333, 2}_2 ∧  b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧ -p_666) -> break
c  in CNF:
c    -b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨  b^{333, 2}_0 ∨  p_666 ∨ break
c  in DIMACS:
-23912 -23913  23914  666 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{333, 2}_2 ∧ -b^{333, 2}_1 ∧ -b^{333, 2}_0 ∧ true) 
c  in CNF:
c    -b^{333, 2}_2 ∨  b^{333, 2}_1 ∨  b^{333, 2}_0 ∨ false 
c  in DIMACS:
-23912  23913  23914  0

c  3 does not represent an automaton state.
c    -(-b^{333, 2}_2 ∧  b^{333, 2}_1 ∧  b^{333, 2}_0 ∧ true) 
c  in CNF:
c     b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ false 
c  in DIMACS:
 23912 -23913 -23914  0
c  -3 does not represent an automaton state.
c    -( b^{333, 2}_2 ∧  b^{333, 2}_1 ∧  b^{333, 2}_0 ∧ true) 
c  in CNF:
c    -b^{333, 2}_2 ∨ -b^{333, 2}_1 ∨ -b^{333, 2}_0 ∨ false 
c  in DIMACS:
-23912 -23913 -23914  0

c i = 3
c  -2+1 --> -1
c    ( b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧  p_999) -> ( b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧  b^{333, 4}_0)
c  in CNF:
c    -b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨  b^{333, 4}_2
c    -b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_1
c    -b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨  b^{333, 4}_0
c  in DIMACS:
-23915 -23916  23917 -999  23918 0
-23915 -23916  23917 -999 -23919 0
-23915 -23916  23917 -999  23920 0

c  -1+1 --> 0
c    ( b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0 ∧  p_999) -> (-b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧ -b^{333, 4}_0)
c  in CNF:
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_2
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_1
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_0
c  in DIMACS:
-23915  23916 -23917 -999 -23918 0
-23915  23916 -23917 -999 -23919 0
-23915  23916 -23917 -999 -23920 0

c  0+1 --> 1
c    (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧  p_999) -> (-b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧  b^{333, 4}_0)
c  in CNF:
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_2
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_1
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨  b^{333, 4}_0
c  in DIMACS:
 23915  23916  23917 -999 -23918 0
 23915  23916  23917 -999 -23919 0
 23915  23916  23917 -999  23920 0

c  1+1 --> 2
c    (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0 ∧  p_999) -> (-b^{333, 4}_2 ∧  b^{333, 4}_1 ∧ -b^{333, 4}_0)
c  in CNF:
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_2
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨  b^{333, 4}_1
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ -p_999 ∨ -b^{333, 4}_0
c  in DIMACS:
 23915  23916 -23917 -999 -23918 0
 23915  23916 -23917 -999  23919 0
 23915  23916 -23917 -999 -23920 0

c  2+1 --> break 
c    (-b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧  p_999) -> break
c  in CNF:
c     b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ -p_999 ∨ break
c  in DIMACS:
 23915 -23916  23917 -999 1162 0


c  2-1 --> 1
c    (-b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧ -p_999) -> (-b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧  b^{333, 4}_0)
c  in CNF:
c     b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_2
c     b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_1
c     b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨  b^{333, 4}_0
c  in DIMACS:
 23915 -23916  23917  999 -23918 0
 23915 -23916  23917  999 -23919 0
 23915 -23916  23917  999  23920 0

c  1-1 --> 0
c    (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0 ∧ -p_999) -> (-b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧ -b^{333, 4}_0)
c  in CNF:
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_2
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_1
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_0
c  in DIMACS:
 23915  23916 -23917  999 -23918 0
 23915  23916 -23917  999 -23919 0
 23915  23916 -23917  999 -23920 0

c  0-1 --> -1
c    (-b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧ -p_999) -> ( b^{333, 4}_2 ∧ -b^{333, 4}_1 ∧  b^{333, 4}_0)
c  in CNF:
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨  b^{333, 4}_2
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_1
c     b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨  b^{333, 4}_0
c  in DIMACS:
 23915  23916  23917  999  23918 0
 23915  23916  23917  999 -23919 0
 23915  23916  23917  999  23920 0

c  -1-1 --> -2
c    ( b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧  b^{333, 3}_0 ∧ -p_999) -> ( b^{333, 4}_2 ∧  b^{333, 4}_1 ∧ -b^{333, 4}_0)
c  in CNF:
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨  b^{333, 4}_2
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨  b^{333, 4}_1
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨  p_999 ∨ -b^{333, 4}_0
c  in DIMACS:
-23915  23916 -23917  999  23918 0
-23915  23916 -23917  999  23919 0
-23915  23916 -23917  999 -23920 0

c  -2-1 --> break 
c    ( b^{333, 3}_2 ∧  b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧ -p_999) -> break
c  in CNF:
c    -b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨  b^{333, 3}_0 ∨  p_999 ∨ break
c  in DIMACS:
-23915 -23916  23917  999 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{333, 3}_2 ∧ -b^{333, 3}_1 ∧ -b^{333, 3}_0 ∧ true) 
c  in CNF:
c    -b^{333, 3}_2 ∨  b^{333, 3}_1 ∨  b^{333, 3}_0 ∨ false 
c  in DIMACS:
-23915  23916  23917  0

c  3 does not represent an automaton state.
c    -(-b^{333, 3}_2 ∧  b^{333, 3}_1 ∧  b^{333, 3}_0 ∧ true) 
c  in CNF:
c     b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ false 
c  in DIMACS:
 23915 -23916 -23917  0
c  -3 does not represent an automaton state.
c    -( b^{333, 3}_2 ∧  b^{333, 3}_1 ∧  b^{333, 3}_0 ∧ true) 
c  in CNF:
c    -b^{333, 3}_2 ∨ -b^{333, 3}_1 ∨ -b^{333, 3}_0 ∨ false 
c  in DIMACS:
-23915 -23916 -23917  0

c INIT for k = 334
c    -b^{334, 1}_2
c    -b^{334, 1}_1
c    -b^{334, 1}_0
c  in DIMACS:
-23921 0
-23922 0
-23923 0

c Transitions for k = 334
c i = 1
c  -2+1 --> -1
c    ( b^{334, 1}_2 ∧  b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧  p_334) -> ( b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0)
c  in CNF:
c    -b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨  b^{334, 2}_2
c    -b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_1
c    -b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨  b^{334, 2}_0
c  in DIMACS:
-23921 -23922  23923 -334  23924 0
-23921 -23922  23923 -334 -23925 0
-23921 -23922  23923 -334  23926 0

c  -1+1 --> 0
c    ( b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧  b^{334, 1}_0 ∧  p_334) -> (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧ -b^{334, 2}_0)
c  in CNF:
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_2
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_1
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_0
c  in DIMACS:
-23921  23922 -23923 -334 -23924 0
-23921  23922 -23923 -334 -23925 0
-23921  23922 -23923 -334 -23926 0

c  0+1 --> 1
c    (-b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧  p_334) -> (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0)
c  in CNF:
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_2
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_1
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨  b^{334, 2}_0
c  in DIMACS:
 23921  23922  23923 -334 -23924 0
 23921  23922  23923 -334 -23925 0
 23921  23922  23923 -334  23926 0

c  1+1 --> 2
c    (-b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧  b^{334, 1}_0 ∧  p_334) -> (-b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0)
c  in CNF:
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_2
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨  b^{334, 2}_1
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ -p_334 ∨ -b^{334, 2}_0
c  in DIMACS:
 23921  23922 -23923 -334 -23924 0
 23921  23922 -23923 -334  23925 0
 23921  23922 -23923 -334 -23926 0

c  2+1 --> break 
c    (-b^{334, 1}_2 ∧  b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧  p_334) -> break
c  in CNF:
c     b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ -p_334 ∨ break
c  in DIMACS:
 23921 -23922  23923 -334 1162 0


c  2-1 --> 1
c    (-b^{334, 1}_2 ∧  b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧ -p_334) -> (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0)
c  in CNF:
c     b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_2
c     b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_1
c     b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨  b^{334, 2}_0
c  in DIMACS:
 23921 -23922  23923  334 -23924 0
 23921 -23922  23923  334 -23925 0
 23921 -23922  23923  334  23926 0

c  1-1 --> 0
c    (-b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧  b^{334, 1}_0 ∧ -p_334) -> (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧ -b^{334, 2}_0)
c  in CNF:
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_2
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_1
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_0
c  in DIMACS:
 23921  23922 -23923  334 -23924 0
 23921  23922 -23923  334 -23925 0
 23921  23922 -23923  334 -23926 0

c  0-1 --> -1
c    (-b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧ -p_334) -> ( b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0)
c  in CNF:
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨  b^{334, 2}_2
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_1
c     b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨  b^{334, 2}_0
c  in DIMACS:
 23921  23922  23923  334  23924 0
 23921  23922  23923  334 -23925 0
 23921  23922  23923  334  23926 0

c  -1-1 --> -2
c    ( b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧  b^{334, 1}_0 ∧ -p_334) -> ( b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0)
c  in CNF:
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨  b^{334, 2}_2
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨  b^{334, 2}_1
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨  p_334 ∨ -b^{334, 2}_0
c  in DIMACS:
-23921  23922 -23923  334  23924 0
-23921  23922 -23923  334  23925 0
-23921  23922 -23923  334 -23926 0

c  -2-1 --> break 
c    ( b^{334, 1}_2 ∧  b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧ -p_334) -> break
c  in CNF:
c    -b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨  b^{334, 1}_0 ∨  p_334 ∨ break
c  in DIMACS:
-23921 -23922  23923  334 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{334, 1}_2 ∧ -b^{334, 1}_1 ∧ -b^{334, 1}_0 ∧ true) 
c  in CNF:
c    -b^{334, 1}_2 ∨  b^{334, 1}_1 ∨  b^{334, 1}_0 ∨ false 
c  in DIMACS:
-23921  23922  23923  0

c  3 does not represent an automaton state.
c    -(-b^{334, 1}_2 ∧  b^{334, 1}_1 ∧  b^{334, 1}_0 ∧ true) 
c  in CNF:
c     b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ false 
c  in DIMACS:
 23921 -23922 -23923  0
c  -3 does not represent an automaton state.
c    -( b^{334, 1}_2 ∧  b^{334, 1}_1 ∧  b^{334, 1}_0 ∧ true) 
c  in CNF:
c    -b^{334, 1}_2 ∨ -b^{334, 1}_1 ∨ -b^{334, 1}_0 ∨ false 
c  in DIMACS:
-23921 -23922 -23923  0

c i = 2
c  -2+1 --> -1
c    ( b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧  p_668) -> ( b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0)
c  in CNF:
c    -b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨  b^{334, 3}_2
c    -b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_1
c    -b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨  b^{334, 3}_0
c  in DIMACS:
-23924 -23925  23926 -668  23927 0
-23924 -23925  23926 -668 -23928 0
-23924 -23925  23926 -668  23929 0

c  -1+1 --> 0
c    ( b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0 ∧  p_668) -> (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧ -b^{334, 3}_0)
c  in CNF:
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_2
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_1
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_0
c  in DIMACS:
-23924  23925 -23926 -668 -23927 0
-23924  23925 -23926 -668 -23928 0
-23924  23925 -23926 -668 -23929 0

c  0+1 --> 1
c    (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧  p_668) -> (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0)
c  in CNF:
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_2
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_1
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨  b^{334, 3}_0
c  in DIMACS:
 23924  23925  23926 -668 -23927 0
 23924  23925  23926 -668 -23928 0
 23924  23925  23926 -668  23929 0

c  1+1 --> 2
c    (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0 ∧  p_668) -> (-b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0)
c  in CNF:
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_2
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨  b^{334, 3}_1
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ -p_668 ∨ -b^{334, 3}_0
c  in DIMACS:
 23924  23925 -23926 -668 -23927 0
 23924  23925 -23926 -668  23928 0
 23924  23925 -23926 -668 -23929 0

c  2+1 --> break 
c    (-b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧  p_668) -> break
c  in CNF:
c     b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ -p_668 ∨ break
c  in DIMACS:
 23924 -23925  23926 -668 1162 0


c  2-1 --> 1
c    (-b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧ -p_668) -> (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0)
c  in CNF:
c     b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_2
c     b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_1
c     b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨  b^{334, 3}_0
c  in DIMACS:
 23924 -23925  23926  668 -23927 0
 23924 -23925  23926  668 -23928 0
 23924 -23925  23926  668  23929 0

c  1-1 --> 0
c    (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0 ∧ -p_668) -> (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧ -b^{334, 3}_0)
c  in CNF:
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_2
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_1
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_0
c  in DIMACS:
 23924  23925 -23926  668 -23927 0
 23924  23925 -23926  668 -23928 0
 23924  23925 -23926  668 -23929 0

c  0-1 --> -1
c    (-b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧ -p_668) -> ( b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0)
c  in CNF:
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨  b^{334, 3}_2
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_1
c     b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨  b^{334, 3}_0
c  in DIMACS:
 23924  23925  23926  668  23927 0
 23924  23925  23926  668 -23928 0
 23924  23925  23926  668  23929 0

c  -1-1 --> -2
c    ( b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧  b^{334, 2}_0 ∧ -p_668) -> ( b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0)
c  in CNF:
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨  b^{334, 3}_2
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨  b^{334, 3}_1
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨  p_668 ∨ -b^{334, 3}_0
c  in DIMACS:
-23924  23925 -23926  668  23927 0
-23924  23925 -23926  668  23928 0
-23924  23925 -23926  668 -23929 0

c  -2-1 --> break 
c    ( b^{334, 2}_2 ∧  b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧ -p_668) -> break
c  in CNF:
c    -b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨  b^{334, 2}_0 ∨  p_668 ∨ break
c  in DIMACS:
-23924 -23925  23926  668 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{334, 2}_2 ∧ -b^{334, 2}_1 ∧ -b^{334, 2}_0 ∧ true) 
c  in CNF:
c    -b^{334, 2}_2 ∨  b^{334, 2}_1 ∨  b^{334, 2}_0 ∨ false 
c  in DIMACS:
-23924  23925  23926  0

c  3 does not represent an automaton state.
c    -(-b^{334, 2}_2 ∧  b^{334, 2}_1 ∧  b^{334, 2}_0 ∧ true) 
c  in CNF:
c     b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ false 
c  in DIMACS:
 23924 -23925 -23926  0
c  -3 does not represent an automaton state.
c    -( b^{334, 2}_2 ∧  b^{334, 2}_1 ∧  b^{334, 2}_0 ∧ true) 
c  in CNF:
c    -b^{334, 2}_2 ∨ -b^{334, 2}_1 ∨ -b^{334, 2}_0 ∨ false 
c  in DIMACS:
-23924 -23925 -23926  0

c i = 3
c  -2+1 --> -1
c    ( b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧  p_1002) -> ( b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧  b^{334, 4}_0)
c  in CNF:
c    -b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨  b^{334, 4}_2
c    -b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_1
c    -b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨  b^{334, 4}_0
c  in DIMACS:
-23927 -23928  23929 -1002  23930 0
-23927 -23928  23929 -1002 -23931 0
-23927 -23928  23929 -1002  23932 0

c  -1+1 --> 0
c    ( b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0 ∧  p_1002) -> (-b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧ -b^{334, 4}_0)
c  in CNF:
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_2
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_1
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_0
c  in DIMACS:
-23927  23928 -23929 -1002 -23930 0
-23927  23928 -23929 -1002 -23931 0
-23927  23928 -23929 -1002 -23932 0

c  0+1 --> 1
c    (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧  p_1002) -> (-b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧  b^{334, 4}_0)
c  in CNF:
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_2
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_1
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨  b^{334, 4}_0
c  in DIMACS:
 23927  23928  23929 -1002 -23930 0
 23927  23928  23929 -1002 -23931 0
 23927  23928  23929 -1002  23932 0

c  1+1 --> 2
c    (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0 ∧  p_1002) -> (-b^{334, 4}_2 ∧  b^{334, 4}_1 ∧ -b^{334, 4}_0)
c  in CNF:
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_2
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨  b^{334, 4}_1
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ -p_1002 ∨ -b^{334, 4}_0
c  in DIMACS:
 23927  23928 -23929 -1002 -23930 0
 23927  23928 -23929 -1002  23931 0
 23927  23928 -23929 -1002 -23932 0

c  2+1 --> break 
c    (-b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧  p_1002) -> break
c  in CNF:
c     b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ -p_1002 ∨ break
c  in DIMACS:
 23927 -23928  23929 -1002 1162 0


c  2-1 --> 1
c    (-b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧ -p_1002) -> (-b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧  b^{334, 4}_0)
c  in CNF:
c     b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_2
c     b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_1
c     b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨  b^{334, 4}_0
c  in DIMACS:
 23927 -23928  23929  1002 -23930 0
 23927 -23928  23929  1002 -23931 0
 23927 -23928  23929  1002  23932 0

c  1-1 --> 0
c    (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0 ∧ -p_1002) -> (-b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧ -b^{334, 4}_0)
c  in CNF:
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_2
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_1
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_0
c  in DIMACS:
 23927  23928 -23929  1002 -23930 0
 23927  23928 -23929  1002 -23931 0
 23927  23928 -23929  1002 -23932 0

c  0-1 --> -1
c    (-b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧ -p_1002) -> ( b^{334, 4}_2 ∧ -b^{334, 4}_1 ∧  b^{334, 4}_0)
c  in CNF:
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨  b^{334, 4}_2
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_1
c     b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨  b^{334, 4}_0
c  in DIMACS:
 23927  23928  23929  1002  23930 0
 23927  23928  23929  1002 -23931 0
 23927  23928  23929  1002  23932 0

c  -1-1 --> -2
c    ( b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧  b^{334, 3}_0 ∧ -p_1002) -> ( b^{334, 4}_2 ∧  b^{334, 4}_1 ∧ -b^{334, 4}_0)
c  in CNF:
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨  b^{334, 4}_2
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨  b^{334, 4}_1
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨  p_1002 ∨ -b^{334, 4}_0
c  in DIMACS:
-23927  23928 -23929  1002  23930 0
-23927  23928 -23929  1002  23931 0
-23927  23928 -23929  1002 -23932 0

c  -2-1 --> break 
c    ( b^{334, 3}_2 ∧  b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧ -p_1002) -> break
c  in CNF:
c    -b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨  b^{334, 3}_0 ∨  p_1002 ∨ break
c  in DIMACS:
-23927 -23928  23929  1002 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{334, 3}_2 ∧ -b^{334, 3}_1 ∧ -b^{334, 3}_0 ∧ true) 
c  in CNF:
c    -b^{334, 3}_2 ∨  b^{334, 3}_1 ∨  b^{334, 3}_0 ∨ false 
c  in DIMACS:
-23927  23928  23929  0

c  3 does not represent an automaton state.
c    -(-b^{334, 3}_2 ∧  b^{334, 3}_1 ∧  b^{334, 3}_0 ∧ true) 
c  in CNF:
c     b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ false 
c  in DIMACS:
 23927 -23928 -23929  0
c  -3 does not represent an automaton state.
c    -( b^{334, 3}_2 ∧  b^{334, 3}_1 ∧  b^{334, 3}_0 ∧ true) 
c  in CNF:
c    -b^{334, 3}_2 ∨ -b^{334, 3}_1 ∨ -b^{334, 3}_0 ∨ false 
c  in DIMACS:
-23927 -23928 -23929  0

c INIT for k = 335
c    -b^{335, 1}_2
c    -b^{335, 1}_1
c    -b^{335, 1}_0
c  in DIMACS:
-23933 0
-23934 0
-23935 0

c Transitions for k = 335
c i = 1
c  -2+1 --> -1
c    ( b^{335, 1}_2 ∧  b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧  p_335) -> ( b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0)
c  in CNF:
c    -b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨  b^{335, 2}_2
c    -b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_1
c    -b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨  b^{335, 2}_0
c  in DIMACS:
-23933 -23934  23935 -335  23936 0
-23933 -23934  23935 -335 -23937 0
-23933 -23934  23935 -335  23938 0

c  -1+1 --> 0
c    ( b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧  b^{335, 1}_0 ∧  p_335) -> (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧ -b^{335, 2}_0)
c  in CNF:
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_2
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_1
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_0
c  in DIMACS:
-23933  23934 -23935 -335 -23936 0
-23933  23934 -23935 -335 -23937 0
-23933  23934 -23935 -335 -23938 0

c  0+1 --> 1
c    (-b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧  p_335) -> (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0)
c  in CNF:
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_2
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_1
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨  b^{335, 2}_0
c  in DIMACS:
 23933  23934  23935 -335 -23936 0
 23933  23934  23935 -335 -23937 0
 23933  23934  23935 -335  23938 0

c  1+1 --> 2
c    (-b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧  b^{335, 1}_0 ∧  p_335) -> (-b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0)
c  in CNF:
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_2
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨  b^{335, 2}_1
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ -p_335 ∨ -b^{335, 2}_0
c  in DIMACS:
 23933  23934 -23935 -335 -23936 0
 23933  23934 -23935 -335  23937 0
 23933  23934 -23935 -335 -23938 0

c  2+1 --> break 
c    (-b^{335, 1}_2 ∧  b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧  p_335) -> break
c  in CNF:
c     b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ -p_335 ∨ break
c  in DIMACS:
 23933 -23934  23935 -335 1162 0


c  2-1 --> 1
c    (-b^{335, 1}_2 ∧  b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧ -p_335) -> (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0)
c  in CNF:
c     b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_2
c     b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_1
c     b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨  b^{335, 2}_0
c  in DIMACS:
 23933 -23934  23935  335 -23936 0
 23933 -23934  23935  335 -23937 0
 23933 -23934  23935  335  23938 0

c  1-1 --> 0
c    (-b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧  b^{335, 1}_0 ∧ -p_335) -> (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧ -b^{335, 2}_0)
c  in CNF:
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_2
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_1
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_0
c  in DIMACS:
 23933  23934 -23935  335 -23936 0
 23933  23934 -23935  335 -23937 0
 23933  23934 -23935  335 -23938 0

c  0-1 --> -1
c    (-b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧ -p_335) -> ( b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0)
c  in CNF:
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨  b^{335, 2}_2
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_1
c     b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨  b^{335, 2}_0
c  in DIMACS:
 23933  23934  23935  335  23936 0
 23933  23934  23935  335 -23937 0
 23933  23934  23935  335  23938 0

c  -1-1 --> -2
c    ( b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧  b^{335, 1}_0 ∧ -p_335) -> ( b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0)
c  in CNF:
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨  b^{335, 2}_2
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨  b^{335, 2}_1
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨  p_335 ∨ -b^{335, 2}_0
c  in DIMACS:
-23933  23934 -23935  335  23936 0
-23933  23934 -23935  335  23937 0
-23933  23934 -23935  335 -23938 0

c  -2-1 --> break 
c    ( b^{335, 1}_2 ∧  b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧ -p_335) -> break
c  in CNF:
c    -b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨  b^{335, 1}_0 ∨  p_335 ∨ break
c  in DIMACS:
-23933 -23934  23935  335 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{335, 1}_2 ∧ -b^{335, 1}_1 ∧ -b^{335, 1}_0 ∧ true) 
c  in CNF:
c    -b^{335, 1}_2 ∨  b^{335, 1}_1 ∨  b^{335, 1}_0 ∨ false 
c  in DIMACS:
-23933  23934  23935  0

c  3 does not represent an automaton state.
c    -(-b^{335, 1}_2 ∧  b^{335, 1}_1 ∧  b^{335, 1}_0 ∧ true) 
c  in CNF:
c     b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ false 
c  in DIMACS:
 23933 -23934 -23935  0
c  -3 does not represent an automaton state.
c    -( b^{335, 1}_2 ∧  b^{335, 1}_1 ∧  b^{335, 1}_0 ∧ true) 
c  in CNF:
c    -b^{335, 1}_2 ∨ -b^{335, 1}_1 ∨ -b^{335, 1}_0 ∨ false 
c  in DIMACS:
-23933 -23934 -23935  0

c i = 2
c  -2+1 --> -1
c    ( b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧  p_670) -> ( b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0)
c  in CNF:
c    -b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨  b^{335, 3}_2
c    -b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_1
c    -b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨  b^{335, 3}_0
c  in DIMACS:
-23936 -23937  23938 -670  23939 0
-23936 -23937  23938 -670 -23940 0
-23936 -23937  23938 -670  23941 0

c  -1+1 --> 0
c    ( b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0 ∧  p_670) -> (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧ -b^{335, 3}_0)
c  in CNF:
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_2
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_1
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_0
c  in DIMACS:
-23936  23937 -23938 -670 -23939 0
-23936  23937 -23938 -670 -23940 0
-23936  23937 -23938 -670 -23941 0

c  0+1 --> 1
c    (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧  p_670) -> (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0)
c  in CNF:
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_2
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_1
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨  b^{335, 3}_0
c  in DIMACS:
 23936  23937  23938 -670 -23939 0
 23936  23937  23938 -670 -23940 0
 23936  23937  23938 -670  23941 0

c  1+1 --> 2
c    (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0 ∧  p_670) -> (-b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0)
c  in CNF:
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_2
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨  b^{335, 3}_1
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ -p_670 ∨ -b^{335, 3}_0
c  in DIMACS:
 23936  23937 -23938 -670 -23939 0
 23936  23937 -23938 -670  23940 0
 23936  23937 -23938 -670 -23941 0

c  2+1 --> break 
c    (-b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧  p_670) -> break
c  in CNF:
c     b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ -p_670 ∨ break
c  in DIMACS:
 23936 -23937  23938 -670 1162 0


c  2-1 --> 1
c    (-b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧ -p_670) -> (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0)
c  in CNF:
c     b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_2
c     b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_1
c     b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨  b^{335, 3}_0
c  in DIMACS:
 23936 -23937  23938  670 -23939 0
 23936 -23937  23938  670 -23940 0
 23936 -23937  23938  670  23941 0

c  1-1 --> 0
c    (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0 ∧ -p_670) -> (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧ -b^{335, 3}_0)
c  in CNF:
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_2
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_1
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_0
c  in DIMACS:
 23936  23937 -23938  670 -23939 0
 23936  23937 -23938  670 -23940 0
 23936  23937 -23938  670 -23941 0

c  0-1 --> -1
c    (-b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧ -p_670) -> ( b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0)
c  in CNF:
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨  b^{335, 3}_2
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_1
c     b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨  b^{335, 3}_0
c  in DIMACS:
 23936  23937  23938  670  23939 0
 23936  23937  23938  670 -23940 0
 23936  23937  23938  670  23941 0

c  -1-1 --> -2
c    ( b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧  b^{335, 2}_0 ∧ -p_670) -> ( b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0)
c  in CNF:
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨  b^{335, 3}_2
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨  b^{335, 3}_1
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨  p_670 ∨ -b^{335, 3}_0
c  in DIMACS:
-23936  23937 -23938  670  23939 0
-23936  23937 -23938  670  23940 0
-23936  23937 -23938  670 -23941 0

c  -2-1 --> break 
c    ( b^{335, 2}_2 ∧  b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧ -p_670) -> break
c  in CNF:
c    -b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨  b^{335, 2}_0 ∨  p_670 ∨ break
c  in DIMACS:
-23936 -23937  23938  670 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{335, 2}_2 ∧ -b^{335, 2}_1 ∧ -b^{335, 2}_0 ∧ true) 
c  in CNF:
c    -b^{335, 2}_2 ∨  b^{335, 2}_1 ∨  b^{335, 2}_0 ∨ false 
c  in DIMACS:
-23936  23937  23938  0

c  3 does not represent an automaton state.
c    -(-b^{335, 2}_2 ∧  b^{335, 2}_1 ∧  b^{335, 2}_0 ∧ true) 
c  in CNF:
c     b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ false 
c  in DIMACS:
 23936 -23937 -23938  0
c  -3 does not represent an automaton state.
c    -( b^{335, 2}_2 ∧  b^{335, 2}_1 ∧  b^{335, 2}_0 ∧ true) 
c  in CNF:
c    -b^{335, 2}_2 ∨ -b^{335, 2}_1 ∨ -b^{335, 2}_0 ∨ false 
c  in DIMACS:
-23936 -23937 -23938  0

c i = 3
c  -2+1 --> -1
c    ( b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧  p_1005) -> ( b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧  b^{335, 4}_0)
c  in CNF:
c    -b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨  b^{335, 4}_2
c    -b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_1
c    -b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨  b^{335, 4}_0
c  in DIMACS:
-23939 -23940  23941 -1005  23942 0
-23939 -23940  23941 -1005 -23943 0
-23939 -23940  23941 -1005  23944 0

c  -1+1 --> 0
c    ( b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0 ∧  p_1005) -> (-b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧ -b^{335, 4}_0)
c  in CNF:
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_2
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_1
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_0
c  in DIMACS:
-23939  23940 -23941 -1005 -23942 0
-23939  23940 -23941 -1005 -23943 0
-23939  23940 -23941 -1005 -23944 0

c  0+1 --> 1
c    (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧  p_1005) -> (-b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧  b^{335, 4}_0)
c  in CNF:
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_2
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_1
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨  b^{335, 4}_0
c  in DIMACS:
 23939  23940  23941 -1005 -23942 0
 23939  23940  23941 -1005 -23943 0
 23939  23940  23941 -1005  23944 0

c  1+1 --> 2
c    (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0 ∧  p_1005) -> (-b^{335, 4}_2 ∧  b^{335, 4}_1 ∧ -b^{335, 4}_0)
c  in CNF:
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_2
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨  b^{335, 4}_1
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ -p_1005 ∨ -b^{335, 4}_0
c  in DIMACS:
 23939  23940 -23941 -1005 -23942 0
 23939  23940 -23941 -1005  23943 0
 23939  23940 -23941 -1005 -23944 0

c  2+1 --> break 
c    (-b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧  p_1005) -> break
c  in CNF:
c     b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ -p_1005 ∨ break
c  in DIMACS:
 23939 -23940  23941 -1005 1162 0


c  2-1 --> 1
c    (-b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧ -p_1005) -> (-b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧  b^{335, 4}_0)
c  in CNF:
c     b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_2
c     b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_1
c     b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨  b^{335, 4}_0
c  in DIMACS:
 23939 -23940  23941  1005 -23942 0
 23939 -23940  23941  1005 -23943 0
 23939 -23940  23941  1005  23944 0

c  1-1 --> 0
c    (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0 ∧ -p_1005) -> (-b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧ -b^{335, 4}_0)
c  in CNF:
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_2
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_1
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_0
c  in DIMACS:
 23939  23940 -23941  1005 -23942 0
 23939  23940 -23941  1005 -23943 0
 23939  23940 -23941  1005 -23944 0

c  0-1 --> -1
c    (-b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧ -p_1005) -> ( b^{335, 4}_2 ∧ -b^{335, 4}_1 ∧  b^{335, 4}_0)
c  in CNF:
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨  b^{335, 4}_2
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_1
c     b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨  b^{335, 4}_0
c  in DIMACS:
 23939  23940  23941  1005  23942 0
 23939  23940  23941  1005 -23943 0
 23939  23940  23941  1005  23944 0

c  -1-1 --> -2
c    ( b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧  b^{335, 3}_0 ∧ -p_1005) -> ( b^{335, 4}_2 ∧  b^{335, 4}_1 ∧ -b^{335, 4}_0)
c  in CNF:
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨  b^{335, 4}_2
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨  b^{335, 4}_1
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨  p_1005 ∨ -b^{335, 4}_0
c  in DIMACS:
-23939  23940 -23941  1005  23942 0
-23939  23940 -23941  1005  23943 0
-23939  23940 -23941  1005 -23944 0

c  -2-1 --> break 
c    ( b^{335, 3}_2 ∧  b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧ -p_1005) -> break
c  in CNF:
c    -b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨  b^{335, 3}_0 ∨  p_1005 ∨ break
c  in DIMACS:
-23939 -23940  23941  1005 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{335, 3}_2 ∧ -b^{335, 3}_1 ∧ -b^{335, 3}_0 ∧ true) 
c  in CNF:
c    -b^{335, 3}_2 ∨  b^{335, 3}_1 ∨  b^{335, 3}_0 ∨ false 
c  in DIMACS:
-23939  23940  23941  0

c  3 does not represent an automaton state.
c    -(-b^{335, 3}_2 ∧  b^{335, 3}_1 ∧  b^{335, 3}_0 ∧ true) 
c  in CNF:
c     b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ false 
c  in DIMACS:
 23939 -23940 -23941  0
c  -3 does not represent an automaton state.
c    -( b^{335, 3}_2 ∧  b^{335, 3}_1 ∧  b^{335, 3}_0 ∧ true) 
c  in CNF:
c    -b^{335, 3}_2 ∨ -b^{335, 3}_1 ∨ -b^{335, 3}_0 ∨ false 
c  in DIMACS:
-23939 -23940 -23941  0

c INIT for k = 336
c    -b^{336, 1}_2
c    -b^{336, 1}_1
c    -b^{336, 1}_0
c  in DIMACS:
-23945 0
-23946 0
-23947 0

c Transitions for k = 336
c i = 1
c  -2+1 --> -1
c    ( b^{336, 1}_2 ∧  b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧  p_336) -> ( b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0)
c  in CNF:
c    -b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨  b^{336, 2}_2
c    -b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_1
c    -b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨  b^{336, 2}_0
c  in DIMACS:
-23945 -23946  23947 -336  23948 0
-23945 -23946  23947 -336 -23949 0
-23945 -23946  23947 -336  23950 0

c  -1+1 --> 0
c    ( b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧  b^{336, 1}_0 ∧  p_336) -> (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧ -b^{336, 2}_0)
c  in CNF:
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_2
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_1
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_0
c  in DIMACS:
-23945  23946 -23947 -336 -23948 0
-23945  23946 -23947 -336 -23949 0
-23945  23946 -23947 -336 -23950 0

c  0+1 --> 1
c    (-b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧  p_336) -> (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0)
c  in CNF:
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_2
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_1
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨  b^{336, 2}_0
c  in DIMACS:
 23945  23946  23947 -336 -23948 0
 23945  23946  23947 -336 -23949 0
 23945  23946  23947 -336  23950 0

c  1+1 --> 2
c    (-b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧  b^{336, 1}_0 ∧  p_336) -> (-b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0)
c  in CNF:
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_2
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨  b^{336, 2}_1
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ -p_336 ∨ -b^{336, 2}_0
c  in DIMACS:
 23945  23946 -23947 -336 -23948 0
 23945  23946 -23947 -336  23949 0
 23945  23946 -23947 -336 -23950 0

c  2+1 --> break 
c    (-b^{336, 1}_2 ∧  b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧  p_336) -> break
c  in CNF:
c     b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ -p_336 ∨ break
c  in DIMACS:
 23945 -23946  23947 -336 1162 0


c  2-1 --> 1
c    (-b^{336, 1}_2 ∧  b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧ -p_336) -> (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0)
c  in CNF:
c     b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_2
c     b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_1
c     b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨  b^{336, 2}_0
c  in DIMACS:
 23945 -23946  23947  336 -23948 0
 23945 -23946  23947  336 -23949 0
 23945 -23946  23947  336  23950 0

c  1-1 --> 0
c    (-b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧  b^{336, 1}_0 ∧ -p_336) -> (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧ -b^{336, 2}_0)
c  in CNF:
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_2
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_1
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_0
c  in DIMACS:
 23945  23946 -23947  336 -23948 0
 23945  23946 -23947  336 -23949 0
 23945  23946 -23947  336 -23950 0

c  0-1 --> -1
c    (-b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧ -p_336) -> ( b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0)
c  in CNF:
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨  b^{336, 2}_2
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_1
c     b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨  b^{336, 2}_0
c  in DIMACS:
 23945  23946  23947  336  23948 0
 23945  23946  23947  336 -23949 0
 23945  23946  23947  336  23950 0

c  -1-1 --> -2
c    ( b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧  b^{336, 1}_0 ∧ -p_336) -> ( b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0)
c  in CNF:
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨  b^{336, 2}_2
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨  b^{336, 2}_1
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨  p_336 ∨ -b^{336, 2}_0
c  in DIMACS:
-23945  23946 -23947  336  23948 0
-23945  23946 -23947  336  23949 0
-23945  23946 -23947  336 -23950 0

c  -2-1 --> break 
c    ( b^{336, 1}_2 ∧  b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧ -p_336) -> break
c  in CNF:
c    -b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨  b^{336, 1}_0 ∨  p_336 ∨ break
c  in DIMACS:
-23945 -23946  23947  336 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{336, 1}_2 ∧ -b^{336, 1}_1 ∧ -b^{336, 1}_0 ∧ true) 
c  in CNF:
c    -b^{336, 1}_2 ∨  b^{336, 1}_1 ∨  b^{336, 1}_0 ∨ false 
c  in DIMACS:
-23945  23946  23947  0

c  3 does not represent an automaton state.
c    -(-b^{336, 1}_2 ∧  b^{336, 1}_1 ∧  b^{336, 1}_0 ∧ true) 
c  in CNF:
c     b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ false 
c  in DIMACS:
 23945 -23946 -23947  0
c  -3 does not represent an automaton state.
c    -( b^{336, 1}_2 ∧  b^{336, 1}_1 ∧  b^{336, 1}_0 ∧ true) 
c  in CNF:
c    -b^{336, 1}_2 ∨ -b^{336, 1}_1 ∨ -b^{336, 1}_0 ∨ false 
c  in DIMACS:
-23945 -23946 -23947  0

c i = 2
c  -2+1 --> -1
c    ( b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧  p_672) -> ( b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0)
c  in CNF:
c    -b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨  b^{336, 3}_2
c    -b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_1
c    -b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨  b^{336, 3}_0
c  in DIMACS:
-23948 -23949  23950 -672  23951 0
-23948 -23949  23950 -672 -23952 0
-23948 -23949  23950 -672  23953 0

c  -1+1 --> 0
c    ( b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0 ∧  p_672) -> (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧ -b^{336, 3}_0)
c  in CNF:
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_2
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_1
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_0
c  in DIMACS:
-23948  23949 -23950 -672 -23951 0
-23948  23949 -23950 -672 -23952 0
-23948  23949 -23950 -672 -23953 0

c  0+1 --> 1
c    (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧  p_672) -> (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0)
c  in CNF:
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_2
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_1
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨  b^{336, 3}_0
c  in DIMACS:
 23948  23949  23950 -672 -23951 0
 23948  23949  23950 -672 -23952 0
 23948  23949  23950 -672  23953 0

c  1+1 --> 2
c    (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0 ∧  p_672) -> (-b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0)
c  in CNF:
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_2
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨  b^{336, 3}_1
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ -p_672 ∨ -b^{336, 3}_0
c  in DIMACS:
 23948  23949 -23950 -672 -23951 0
 23948  23949 -23950 -672  23952 0
 23948  23949 -23950 -672 -23953 0

c  2+1 --> break 
c    (-b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧  p_672) -> break
c  in CNF:
c     b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ -p_672 ∨ break
c  in DIMACS:
 23948 -23949  23950 -672 1162 0


c  2-1 --> 1
c    (-b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧ -p_672) -> (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0)
c  in CNF:
c     b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_2
c     b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_1
c     b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨  b^{336, 3}_0
c  in DIMACS:
 23948 -23949  23950  672 -23951 0
 23948 -23949  23950  672 -23952 0
 23948 -23949  23950  672  23953 0

c  1-1 --> 0
c    (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0 ∧ -p_672) -> (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧ -b^{336, 3}_0)
c  in CNF:
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_2
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_1
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_0
c  in DIMACS:
 23948  23949 -23950  672 -23951 0
 23948  23949 -23950  672 -23952 0
 23948  23949 -23950  672 -23953 0

c  0-1 --> -1
c    (-b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧ -p_672) -> ( b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0)
c  in CNF:
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨  b^{336, 3}_2
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_1
c     b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨  b^{336, 3}_0
c  in DIMACS:
 23948  23949  23950  672  23951 0
 23948  23949  23950  672 -23952 0
 23948  23949  23950  672  23953 0

c  -1-1 --> -2
c    ( b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧  b^{336, 2}_0 ∧ -p_672) -> ( b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0)
c  in CNF:
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨  b^{336, 3}_2
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨  b^{336, 3}_1
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨  p_672 ∨ -b^{336, 3}_0
c  in DIMACS:
-23948  23949 -23950  672  23951 0
-23948  23949 -23950  672  23952 0
-23948  23949 -23950  672 -23953 0

c  -2-1 --> break 
c    ( b^{336, 2}_2 ∧  b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧ -p_672) -> break
c  in CNF:
c    -b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨  b^{336, 2}_0 ∨  p_672 ∨ break
c  in DIMACS:
-23948 -23949  23950  672 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{336, 2}_2 ∧ -b^{336, 2}_1 ∧ -b^{336, 2}_0 ∧ true) 
c  in CNF:
c    -b^{336, 2}_2 ∨  b^{336, 2}_1 ∨  b^{336, 2}_0 ∨ false 
c  in DIMACS:
-23948  23949  23950  0

c  3 does not represent an automaton state.
c    -(-b^{336, 2}_2 ∧  b^{336, 2}_1 ∧  b^{336, 2}_0 ∧ true) 
c  in CNF:
c     b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ false 
c  in DIMACS:
 23948 -23949 -23950  0
c  -3 does not represent an automaton state.
c    -( b^{336, 2}_2 ∧  b^{336, 2}_1 ∧  b^{336, 2}_0 ∧ true) 
c  in CNF:
c    -b^{336, 2}_2 ∨ -b^{336, 2}_1 ∨ -b^{336, 2}_0 ∨ false 
c  in DIMACS:
-23948 -23949 -23950  0

c i = 3
c  -2+1 --> -1
c    ( b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧  p_1008) -> ( b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧  b^{336, 4}_0)
c  in CNF:
c    -b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨  b^{336, 4}_2
c    -b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_1
c    -b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨  b^{336, 4}_0
c  in DIMACS:
-23951 -23952  23953 -1008  23954 0
-23951 -23952  23953 -1008 -23955 0
-23951 -23952  23953 -1008  23956 0

c  -1+1 --> 0
c    ( b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0 ∧  p_1008) -> (-b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧ -b^{336, 4}_0)
c  in CNF:
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_2
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_1
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_0
c  in DIMACS:
-23951  23952 -23953 -1008 -23954 0
-23951  23952 -23953 -1008 -23955 0
-23951  23952 -23953 -1008 -23956 0

c  0+1 --> 1
c    (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧  p_1008) -> (-b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧  b^{336, 4}_0)
c  in CNF:
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_2
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_1
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨  b^{336, 4}_0
c  in DIMACS:
 23951  23952  23953 -1008 -23954 0
 23951  23952  23953 -1008 -23955 0
 23951  23952  23953 -1008  23956 0

c  1+1 --> 2
c    (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0 ∧  p_1008) -> (-b^{336, 4}_2 ∧  b^{336, 4}_1 ∧ -b^{336, 4}_0)
c  in CNF:
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_2
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨  b^{336, 4}_1
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ -p_1008 ∨ -b^{336, 4}_0
c  in DIMACS:
 23951  23952 -23953 -1008 -23954 0
 23951  23952 -23953 -1008  23955 0
 23951  23952 -23953 -1008 -23956 0

c  2+1 --> break 
c    (-b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧  p_1008) -> break
c  in CNF:
c     b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ -p_1008 ∨ break
c  in DIMACS:
 23951 -23952  23953 -1008 1162 0


c  2-1 --> 1
c    (-b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧ -p_1008) -> (-b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧  b^{336, 4}_0)
c  in CNF:
c     b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_2
c     b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_1
c     b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨  b^{336, 4}_0
c  in DIMACS:
 23951 -23952  23953  1008 -23954 0
 23951 -23952  23953  1008 -23955 0
 23951 -23952  23953  1008  23956 0

c  1-1 --> 0
c    (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0 ∧ -p_1008) -> (-b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧ -b^{336, 4}_0)
c  in CNF:
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_2
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_1
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_0
c  in DIMACS:
 23951  23952 -23953  1008 -23954 0
 23951  23952 -23953  1008 -23955 0
 23951  23952 -23953  1008 -23956 0

c  0-1 --> -1
c    (-b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧ -p_1008) -> ( b^{336, 4}_2 ∧ -b^{336, 4}_1 ∧  b^{336, 4}_0)
c  in CNF:
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨  b^{336, 4}_2
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_1
c     b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨  b^{336, 4}_0
c  in DIMACS:
 23951  23952  23953  1008  23954 0
 23951  23952  23953  1008 -23955 0
 23951  23952  23953  1008  23956 0

c  -1-1 --> -2
c    ( b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧  b^{336, 3}_0 ∧ -p_1008) -> ( b^{336, 4}_2 ∧  b^{336, 4}_1 ∧ -b^{336, 4}_0)
c  in CNF:
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨  b^{336, 4}_2
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨  b^{336, 4}_1
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨  p_1008 ∨ -b^{336, 4}_0
c  in DIMACS:
-23951  23952 -23953  1008  23954 0
-23951  23952 -23953  1008  23955 0
-23951  23952 -23953  1008 -23956 0

c  -2-1 --> break 
c    ( b^{336, 3}_2 ∧  b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧ -p_1008) -> break
c  in CNF:
c    -b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨  b^{336, 3}_0 ∨  p_1008 ∨ break
c  in DIMACS:
-23951 -23952  23953  1008 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{336, 3}_2 ∧ -b^{336, 3}_1 ∧ -b^{336, 3}_0 ∧ true) 
c  in CNF:
c    -b^{336, 3}_2 ∨  b^{336, 3}_1 ∨  b^{336, 3}_0 ∨ false 
c  in DIMACS:
-23951  23952  23953  0

c  3 does not represent an automaton state.
c    -(-b^{336, 3}_2 ∧  b^{336, 3}_1 ∧  b^{336, 3}_0 ∧ true) 
c  in CNF:
c     b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ false 
c  in DIMACS:
 23951 -23952 -23953  0
c  -3 does not represent an automaton state.
c    -( b^{336, 3}_2 ∧  b^{336, 3}_1 ∧  b^{336, 3}_0 ∧ true) 
c  in CNF:
c    -b^{336, 3}_2 ∨ -b^{336, 3}_1 ∨ -b^{336, 3}_0 ∨ false 
c  in DIMACS:
-23951 -23952 -23953  0

c INIT for k = 337
c    -b^{337, 1}_2
c    -b^{337, 1}_1
c    -b^{337, 1}_0
c  in DIMACS:
-23957 0
-23958 0
-23959 0

c Transitions for k = 337
c i = 1
c  -2+1 --> -1
c    ( b^{337, 1}_2 ∧  b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧  p_337) -> ( b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0)
c  in CNF:
c    -b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨  b^{337, 2}_2
c    -b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_1
c    -b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨  b^{337, 2}_0
c  in DIMACS:
-23957 -23958  23959 -337  23960 0
-23957 -23958  23959 -337 -23961 0
-23957 -23958  23959 -337  23962 0

c  -1+1 --> 0
c    ( b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧  b^{337, 1}_0 ∧  p_337) -> (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧ -b^{337, 2}_0)
c  in CNF:
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_2
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_1
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_0
c  in DIMACS:
-23957  23958 -23959 -337 -23960 0
-23957  23958 -23959 -337 -23961 0
-23957  23958 -23959 -337 -23962 0

c  0+1 --> 1
c    (-b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧  p_337) -> (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0)
c  in CNF:
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_2
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_1
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨  b^{337, 2}_0
c  in DIMACS:
 23957  23958  23959 -337 -23960 0
 23957  23958  23959 -337 -23961 0
 23957  23958  23959 -337  23962 0

c  1+1 --> 2
c    (-b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧  b^{337, 1}_0 ∧  p_337) -> (-b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0)
c  in CNF:
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_2
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨  b^{337, 2}_1
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ -p_337 ∨ -b^{337, 2}_0
c  in DIMACS:
 23957  23958 -23959 -337 -23960 0
 23957  23958 -23959 -337  23961 0
 23957  23958 -23959 -337 -23962 0

c  2+1 --> break 
c    (-b^{337, 1}_2 ∧  b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧  p_337) -> break
c  in CNF:
c     b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ -p_337 ∨ break
c  in DIMACS:
 23957 -23958  23959 -337 1162 0


c  2-1 --> 1
c    (-b^{337, 1}_2 ∧  b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧ -p_337) -> (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0)
c  in CNF:
c     b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_2
c     b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_1
c     b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨  b^{337, 2}_0
c  in DIMACS:
 23957 -23958  23959  337 -23960 0
 23957 -23958  23959  337 -23961 0
 23957 -23958  23959  337  23962 0

c  1-1 --> 0
c    (-b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧  b^{337, 1}_0 ∧ -p_337) -> (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧ -b^{337, 2}_0)
c  in CNF:
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_2
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_1
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_0
c  in DIMACS:
 23957  23958 -23959  337 -23960 0
 23957  23958 -23959  337 -23961 0
 23957  23958 -23959  337 -23962 0

c  0-1 --> -1
c    (-b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧ -p_337) -> ( b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0)
c  in CNF:
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨  b^{337, 2}_2
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_1
c     b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨  b^{337, 2}_0
c  in DIMACS:
 23957  23958  23959  337  23960 0
 23957  23958  23959  337 -23961 0
 23957  23958  23959  337  23962 0

c  -1-1 --> -2
c    ( b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧  b^{337, 1}_0 ∧ -p_337) -> ( b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0)
c  in CNF:
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨  b^{337, 2}_2
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨  b^{337, 2}_1
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨  p_337 ∨ -b^{337, 2}_0
c  in DIMACS:
-23957  23958 -23959  337  23960 0
-23957  23958 -23959  337  23961 0
-23957  23958 -23959  337 -23962 0

c  -2-1 --> break 
c    ( b^{337, 1}_2 ∧  b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧ -p_337) -> break
c  in CNF:
c    -b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨  b^{337, 1}_0 ∨  p_337 ∨ break
c  in DIMACS:
-23957 -23958  23959  337 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{337, 1}_2 ∧ -b^{337, 1}_1 ∧ -b^{337, 1}_0 ∧ true) 
c  in CNF:
c    -b^{337, 1}_2 ∨  b^{337, 1}_1 ∨  b^{337, 1}_0 ∨ false 
c  in DIMACS:
-23957  23958  23959  0

c  3 does not represent an automaton state.
c    -(-b^{337, 1}_2 ∧  b^{337, 1}_1 ∧  b^{337, 1}_0 ∧ true) 
c  in CNF:
c     b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ false 
c  in DIMACS:
 23957 -23958 -23959  0
c  -3 does not represent an automaton state.
c    -( b^{337, 1}_2 ∧  b^{337, 1}_1 ∧  b^{337, 1}_0 ∧ true) 
c  in CNF:
c    -b^{337, 1}_2 ∨ -b^{337, 1}_1 ∨ -b^{337, 1}_0 ∨ false 
c  in DIMACS:
-23957 -23958 -23959  0

c i = 2
c  -2+1 --> -1
c    ( b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧  p_674) -> ( b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0)
c  in CNF:
c    -b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨  b^{337, 3}_2
c    -b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_1
c    -b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨  b^{337, 3}_0
c  in DIMACS:
-23960 -23961  23962 -674  23963 0
-23960 -23961  23962 -674 -23964 0
-23960 -23961  23962 -674  23965 0

c  -1+1 --> 0
c    ( b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0 ∧  p_674) -> (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧ -b^{337, 3}_0)
c  in CNF:
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_2
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_1
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_0
c  in DIMACS:
-23960  23961 -23962 -674 -23963 0
-23960  23961 -23962 -674 -23964 0
-23960  23961 -23962 -674 -23965 0

c  0+1 --> 1
c    (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧  p_674) -> (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0)
c  in CNF:
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_2
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_1
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨  b^{337, 3}_0
c  in DIMACS:
 23960  23961  23962 -674 -23963 0
 23960  23961  23962 -674 -23964 0
 23960  23961  23962 -674  23965 0

c  1+1 --> 2
c    (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0 ∧  p_674) -> (-b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0)
c  in CNF:
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_2
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨  b^{337, 3}_1
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ -p_674 ∨ -b^{337, 3}_0
c  in DIMACS:
 23960  23961 -23962 -674 -23963 0
 23960  23961 -23962 -674  23964 0
 23960  23961 -23962 -674 -23965 0

c  2+1 --> break 
c    (-b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧  p_674) -> break
c  in CNF:
c     b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ -p_674 ∨ break
c  in DIMACS:
 23960 -23961  23962 -674 1162 0


c  2-1 --> 1
c    (-b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧ -p_674) -> (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0)
c  in CNF:
c     b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_2
c     b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_1
c     b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨  b^{337, 3}_0
c  in DIMACS:
 23960 -23961  23962  674 -23963 0
 23960 -23961  23962  674 -23964 0
 23960 -23961  23962  674  23965 0

c  1-1 --> 0
c    (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0 ∧ -p_674) -> (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧ -b^{337, 3}_0)
c  in CNF:
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_2
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_1
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_0
c  in DIMACS:
 23960  23961 -23962  674 -23963 0
 23960  23961 -23962  674 -23964 0
 23960  23961 -23962  674 -23965 0

c  0-1 --> -1
c    (-b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧ -p_674) -> ( b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0)
c  in CNF:
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨  b^{337, 3}_2
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_1
c     b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨  b^{337, 3}_0
c  in DIMACS:
 23960  23961  23962  674  23963 0
 23960  23961  23962  674 -23964 0
 23960  23961  23962  674  23965 0

c  -1-1 --> -2
c    ( b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧  b^{337, 2}_0 ∧ -p_674) -> ( b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0)
c  in CNF:
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨  b^{337, 3}_2
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨  b^{337, 3}_1
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨  p_674 ∨ -b^{337, 3}_0
c  in DIMACS:
-23960  23961 -23962  674  23963 0
-23960  23961 -23962  674  23964 0
-23960  23961 -23962  674 -23965 0

c  -2-1 --> break 
c    ( b^{337, 2}_2 ∧  b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧ -p_674) -> break
c  in CNF:
c    -b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨  b^{337, 2}_0 ∨  p_674 ∨ break
c  in DIMACS:
-23960 -23961  23962  674 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{337, 2}_2 ∧ -b^{337, 2}_1 ∧ -b^{337, 2}_0 ∧ true) 
c  in CNF:
c    -b^{337, 2}_2 ∨  b^{337, 2}_1 ∨  b^{337, 2}_0 ∨ false 
c  in DIMACS:
-23960  23961  23962  0

c  3 does not represent an automaton state.
c    -(-b^{337, 2}_2 ∧  b^{337, 2}_1 ∧  b^{337, 2}_0 ∧ true) 
c  in CNF:
c     b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ false 
c  in DIMACS:
 23960 -23961 -23962  0
c  -3 does not represent an automaton state.
c    -( b^{337, 2}_2 ∧  b^{337, 2}_1 ∧  b^{337, 2}_0 ∧ true) 
c  in CNF:
c    -b^{337, 2}_2 ∨ -b^{337, 2}_1 ∨ -b^{337, 2}_0 ∨ false 
c  in DIMACS:
-23960 -23961 -23962  0

c i = 3
c  -2+1 --> -1
c    ( b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧  p_1011) -> ( b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧  b^{337, 4}_0)
c  in CNF:
c    -b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨  b^{337, 4}_2
c    -b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_1
c    -b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨  b^{337, 4}_0
c  in DIMACS:
-23963 -23964  23965 -1011  23966 0
-23963 -23964  23965 -1011 -23967 0
-23963 -23964  23965 -1011  23968 0

c  -1+1 --> 0
c    ( b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0 ∧  p_1011) -> (-b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧ -b^{337, 4}_0)
c  in CNF:
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_2
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_1
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_0
c  in DIMACS:
-23963  23964 -23965 -1011 -23966 0
-23963  23964 -23965 -1011 -23967 0
-23963  23964 -23965 -1011 -23968 0

c  0+1 --> 1
c    (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧  p_1011) -> (-b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧  b^{337, 4}_0)
c  in CNF:
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_2
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_1
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨  b^{337, 4}_0
c  in DIMACS:
 23963  23964  23965 -1011 -23966 0
 23963  23964  23965 -1011 -23967 0
 23963  23964  23965 -1011  23968 0

c  1+1 --> 2
c    (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0 ∧  p_1011) -> (-b^{337, 4}_2 ∧  b^{337, 4}_1 ∧ -b^{337, 4}_0)
c  in CNF:
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_2
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨  b^{337, 4}_1
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ -p_1011 ∨ -b^{337, 4}_0
c  in DIMACS:
 23963  23964 -23965 -1011 -23966 0
 23963  23964 -23965 -1011  23967 0
 23963  23964 -23965 -1011 -23968 0

c  2+1 --> break 
c    (-b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧  p_1011) -> break
c  in CNF:
c     b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ -p_1011 ∨ break
c  in DIMACS:
 23963 -23964  23965 -1011 1162 0


c  2-1 --> 1
c    (-b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧ -p_1011) -> (-b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧  b^{337, 4}_0)
c  in CNF:
c     b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_2
c     b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_1
c     b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨  b^{337, 4}_0
c  in DIMACS:
 23963 -23964  23965  1011 -23966 0
 23963 -23964  23965  1011 -23967 0
 23963 -23964  23965  1011  23968 0

c  1-1 --> 0
c    (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0 ∧ -p_1011) -> (-b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧ -b^{337, 4}_0)
c  in CNF:
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_2
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_1
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_0
c  in DIMACS:
 23963  23964 -23965  1011 -23966 0
 23963  23964 -23965  1011 -23967 0
 23963  23964 -23965  1011 -23968 0

c  0-1 --> -1
c    (-b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧ -p_1011) -> ( b^{337, 4}_2 ∧ -b^{337, 4}_1 ∧  b^{337, 4}_0)
c  in CNF:
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨  b^{337, 4}_2
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_1
c     b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨  b^{337, 4}_0
c  in DIMACS:
 23963  23964  23965  1011  23966 0
 23963  23964  23965  1011 -23967 0
 23963  23964  23965  1011  23968 0

c  -1-1 --> -2
c    ( b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧  b^{337, 3}_0 ∧ -p_1011) -> ( b^{337, 4}_2 ∧  b^{337, 4}_1 ∧ -b^{337, 4}_0)
c  in CNF:
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨  b^{337, 4}_2
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨  b^{337, 4}_1
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨  p_1011 ∨ -b^{337, 4}_0
c  in DIMACS:
-23963  23964 -23965  1011  23966 0
-23963  23964 -23965  1011  23967 0
-23963  23964 -23965  1011 -23968 0

c  -2-1 --> break 
c    ( b^{337, 3}_2 ∧  b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧ -p_1011) -> break
c  in CNF:
c    -b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨  b^{337, 3}_0 ∨  p_1011 ∨ break
c  in DIMACS:
-23963 -23964  23965  1011 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{337, 3}_2 ∧ -b^{337, 3}_1 ∧ -b^{337, 3}_0 ∧ true) 
c  in CNF:
c    -b^{337, 3}_2 ∨  b^{337, 3}_1 ∨  b^{337, 3}_0 ∨ false 
c  in DIMACS:
-23963  23964  23965  0

c  3 does not represent an automaton state.
c    -(-b^{337, 3}_2 ∧  b^{337, 3}_1 ∧  b^{337, 3}_0 ∧ true) 
c  in CNF:
c     b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ false 
c  in DIMACS:
 23963 -23964 -23965  0
c  -3 does not represent an automaton state.
c    -( b^{337, 3}_2 ∧  b^{337, 3}_1 ∧  b^{337, 3}_0 ∧ true) 
c  in CNF:
c    -b^{337, 3}_2 ∨ -b^{337, 3}_1 ∨ -b^{337, 3}_0 ∨ false 
c  in DIMACS:
-23963 -23964 -23965  0

c INIT for k = 338
c    -b^{338, 1}_2
c    -b^{338, 1}_1
c    -b^{338, 1}_0
c  in DIMACS:
-23969 0
-23970 0
-23971 0

c Transitions for k = 338
c i = 1
c  -2+1 --> -1
c    ( b^{338, 1}_2 ∧  b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧  p_338) -> ( b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0)
c  in CNF:
c    -b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨  b^{338, 2}_2
c    -b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_1
c    -b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨  b^{338, 2}_0
c  in DIMACS:
-23969 -23970  23971 -338  23972 0
-23969 -23970  23971 -338 -23973 0
-23969 -23970  23971 -338  23974 0

c  -1+1 --> 0
c    ( b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧  b^{338, 1}_0 ∧  p_338) -> (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧ -b^{338, 2}_0)
c  in CNF:
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_2
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_1
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_0
c  in DIMACS:
-23969  23970 -23971 -338 -23972 0
-23969  23970 -23971 -338 -23973 0
-23969  23970 -23971 -338 -23974 0

c  0+1 --> 1
c    (-b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧  p_338) -> (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0)
c  in CNF:
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_2
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_1
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨  b^{338, 2}_0
c  in DIMACS:
 23969  23970  23971 -338 -23972 0
 23969  23970  23971 -338 -23973 0
 23969  23970  23971 -338  23974 0

c  1+1 --> 2
c    (-b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧  b^{338, 1}_0 ∧  p_338) -> (-b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0)
c  in CNF:
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_2
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨  b^{338, 2}_1
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ -p_338 ∨ -b^{338, 2}_0
c  in DIMACS:
 23969  23970 -23971 -338 -23972 0
 23969  23970 -23971 -338  23973 0
 23969  23970 -23971 -338 -23974 0

c  2+1 --> break 
c    (-b^{338, 1}_2 ∧  b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧  p_338) -> break
c  in CNF:
c     b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ -p_338 ∨ break
c  in DIMACS:
 23969 -23970  23971 -338 1162 0


c  2-1 --> 1
c    (-b^{338, 1}_2 ∧  b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧ -p_338) -> (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0)
c  in CNF:
c     b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_2
c     b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_1
c     b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨  b^{338, 2}_0
c  in DIMACS:
 23969 -23970  23971  338 -23972 0
 23969 -23970  23971  338 -23973 0
 23969 -23970  23971  338  23974 0

c  1-1 --> 0
c    (-b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧  b^{338, 1}_0 ∧ -p_338) -> (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧ -b^{338, 2}_0)
c  in CNF:
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_2
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_1
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_0
c  in DIMACS:
 23969  23970 -23971  338 -23972 0
 23969  23970 -23971  338 -23973 0
 23969  23970 -23971  338 -23974 0

c  0-1 --> -1
c    (-b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧ -p_338) -> ( b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0)
c  in CNF:
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨  b^{338, 2}_2
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_1
c     b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨  b^{338, 2}_0
c  in DIMACS:
 23969  23970  23971  338  23972 0
 23969  23970  23971  338 -23973 0
 23969  23970  23971  338  23974 0

c  -1-1 --> -2
c    ( b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧  b^{338, 1}_0 ∧ -p_338) -> ( b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0)
c  in CNF:
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨  b^{338, 2}_2
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨  b^{338, 2}_1
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨  p_338 ∨ -b^{338, 2}_0
c  in DIMACS:
-23969  23970 -23971  338  23972 0
-23969  23970 -23971  338  23973 0
-23969  23970 -23971  338 -23974 0

c  -2-1 --> break 
c    ( b^{338, 1}_2 ∧  b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧ -p_338) -> break
c  in CNF:
c    -b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨  b^{338, 1}_0 ∨  p_338 ∨ break
c  in DIMACS:
-23969 -23970  23971  338 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{338, 1}_2 ∧ -b^{338, 1}_1 ∧ -b^{338, 1}_0 ∧ true) 
c  in CNF:
c    -b^{338, 1}_2 ∨  b^{338, 1}_1 ∨  b^{338, 1}_0 ∨ false 
c  in DIMACS:
-23969  23970  23971  0

c  3 does not represent an automaton state.
c    -(-b^{338, 1}_2 ∧  b^{338, 1}_1 ∧  b^{338, 1}_0 ∧ true) 
c  in CNF:
c     b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ false 
c  in DIMACS:
 23969 -23970 -23971  0
c  -3 does not represent an automaton state.
c    -( b^{338, 1}_2 ∧  b^{338, 1}_1 ∧  b^{338, 1}_0 ∧ true) 
c  in CNF:
c    -b^{338, 1}_2 ∨ -b^{338, 1}_1 ∨ -b^{338, 1}_0 ∨ false 
c  in DIMACS:
-23969 -23970 -23971  0

c i = 2
c  -2+1 --> -1
c    ( b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧  p_676) -> ( b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0)
c  in CNF:
c    -b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨  b^{338, 3}_2
c    -b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_1
c    -b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨  b^{338, 3}_0
c  in DIMACS:
-23972 -23973  23974 -676  23975 0
-23972 -23973  23974 -676 -23976 0
-23972 -23973  23974 -676  23977 0

c  -1+1 --> 0
c    ( b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0 ∧  p_676) -> (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧ -b^{338, 3}_0)
c  in CNF:
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_2
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_1
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_0
c  in DIMACS:
-23972  23973 -23974 -676 -23975 0
-23972  23973 -23974 -676 -23976 0
-23972  23973 -23974 -676 -23977 0

c  0+1 --> 1
c    (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧  p_676) -> (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0)
c  in CNF:
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_2
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_1
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨  b^{338, 3}_0
c  in DIMACS:
 23972  23973  23974 -676 -23975 0
 23972  23973  23974 -676 -23976 0
 23972  23973  23974 -676  23977 0

c  1+1 --> 2
c    (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0 ∧  p_676) -> (-b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0)
c  in CNF:
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_2
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨  b^{338, 3}_1
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ -p_676 ∨ -b^{338, 3}_0
c  in DIMACS:
 23972  23973 -23974 -676 -23975 0
 23972  23973 -23974 -676  23976 0
 23972  23973 -23974 -676 -23977 0

c  2+1 --> break 
c    (-b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧  p_676) -> break
c  in CNF:
c     b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ -p_676 ∨ break
c  in DIMACS:
 23972 -23973  23974 -676 1162 0


c  2-1 --> 1
c    (-b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧ -p_676) -> (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0)
c  in CNF:
c     b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_2
c     b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_1
c     b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨  b^{338, 3}_0
c  in DIMACS:
 23972 -23973  23974  676 -23975 0
 23972 -23973  23974  676 -23976 0
 23972 -23973  23974  676  23977 0

c  1-1 --> 0
c    (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0 ∧ -p_676) -> (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧ -b^{338, 3}_0)
c  in CNF:
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_2
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_1
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_0
c  in DIMACS:
 23972  23973 -23974  676 -23975 0
 23972  23973 -23974  676 -23976 0
 23972  23973 -23974  676 -23977 0

c  0-1 --> -1
c    (-b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧ -p_676) -> ( b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0)
c  in CNF:
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨  b^{338, 3}_2
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_1
c     b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨  b^{338, 3}_0
c  in DIMACS:
 23972  23973  23974  676  23975 0
 23972  23973  23974  676 -23976 0
 23972  23973  23974  676  23977 0

c  -1-1 --> -2
c    ( b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧  b^{338, 2}_0 ∧ -p_676) -> ( b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0)
c  in CNF:
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨  b^{338, 3}_2
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨  b^{338, 3}_1
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨  p_676 ∨ -b^{338, 3}_0
c  in DIMACS:
-23972  23973 -23974  676  23975 0
-23972  23973 -23974  676  23976 0
-23972  23973 -23974  676 -23977 0

c  -2-1 --> break 
c    ( b^{338, 2}_2 ∧  b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧ -p_676) -> break
c  in CNF:
c    -b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨  b^{338, 2}_0 ∨  p_676 ∨ break
c  in DIMACS:
-23972 -23973  23974  676 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{338, 2}_2 ∧ -b^{338, 2}_1 ∧ -b^{338, 2}_0 ∧ true) 
c  in CNF:
c    -b^{338, 2}_2 ∨  b^{338, 2}_1 ∨  b^{338, 2}_0 ∨ false 
c  in DIMACS:
-23972  23973  23974  0

c  3 does not represent an automaton state.
c    -(-b^{338, 2}_2 ∧  b^{338, 2}_1 ∧  b^{338, 2}_0 ∧ true) 
c  in CNF:
c     b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ false 
c  in DIMACS:
 23972 -23973 -23974  0
c  -3 does not represent an automaton state.
c    -( b^{338, 2}_2 ∧  b^{338, 2}_1 ∧  b^{338, 2}_0 ∧ true) 
c  in CNF:
c    -b^{338, 2}_2 ∨ -b^{338, 2}_1 ∨ -b^{338, 2}_0 ∨ false 
c  in DIMACS:
-23972 -23973 -23974  0

c i = 3
c  -2+1 --> -1
c    ( b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧  p_1014) -> ( b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧  b^{338, 4}_0)
c  in CNF:
c    -b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨  b^{338, 4}_2
c    -b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_1
c    -b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨  b^{338, 4}_0
c  in DIMACS:
-23975 -23976  23977 -1014  23978 0
-23975 -23976  23977 -1014 -23979 0
-23975 -23976  23977 -1014  23980 0

c  -1+1 --> 0
c    ( b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0 ∧  p_1014) -> (-b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧ -b^{338, 4}_0)
c  in CNF:
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_2
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_1
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_0
c  in DIMACS:
-23975  23976 -23977 -1014 -23978 0
-23975  23976 -23977 -1014 -23979 0
-23975  23976 -23977 -1014 -23980 0

c  0+1 --> 1
c    (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧  p_1014) -> (-b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧  b^{338, 4}_0)
c  in CNF:
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_2
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_1
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨  b^{338, 4}_0
c  in DIMACS:
 23975  23976  23977 -1014 -23978 0
 23975  23976  23977 -1014 -23979 0
 23975  23976  23977 -1014  23980 0

c  1+1 --> 2
c    (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0 ∧  p_1014) -> (-b^{338, 4}_2 ∧  b^{338, 4}_1 ∧ -b^{338, 4}_0)
c  in CNF:
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_2
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨  b^{338, 4}_1
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ -p_1014 ∨ -b^{338, 4}_0
c  in DIMACS:
 23975  23976 -23977 -1014 -23978 0
 23975  23976 -23977 -1014  23979 0
 23975  23976 -23977 -1014 -23980 0

c  2+1 --> break 
c    (-b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧  p_1014) -> break
c  in CNF:
c     b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ -p_1014 ∨ break
c  in DIMACS:
 23975 -23976  23977 -1014 1162 0


c  2-1 --> 1
c    (-b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧ -p_1014) -> (-b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧  b^{338, 4}_0)
c  in CNF:
c     b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_2
c     b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_1
c     b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨  b^{338, 4}_0
c  in DIMACS:
 23975 -23976  23977  1014 -23978 0
 23975 -23976  23977  1014 -23979 0
 23975 -23976  23977  1014  23980 0

c  1-1 --> 0
c    (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0 ∧ -p_1014) -> (-b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧ -b^{338, 4}_0)
c  in CNF:
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_2
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_1
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_0
c  in DIMACS:
 23975  23976 -23977  1014 -23978 0
 23975  23976 -23977  1014 -23979 0
 23975  23976 -23977  1014 -23980 0

c  0-1 --> -1
c    (-b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧ -p_1014) -> ( b^{338, 4}_2 ∧ -b^{338, 4}_1 ∧  b^{338, 4}_0)
c  in CNF:
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨  b^{338, 4}_2
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_1
c     b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨  b^{338, 4}_0
c  in DIMACS:
 23975  23976  23977  1014  23978 0
 23975  23976  23977  1014 -23979 0
 23975  23976  23977  1014  23980 0

c  -1-1 --> -2
c    ( b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧  b^{338, 3}_0 ∧ -p_1014) -> ( b^{338, 4}_2 ∧  b^{338, 4}_1 ∧ -b^{338, 4}_0)
c  in CNF:
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨  b^{338, 4}_2
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨  b^{338, 4}_1
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨  p_1014 ∨ -b^{338, 4}_0
c  in DIMACS:
-23975  23976 -23977  1014  23978 0
-23975  23976 -23977  1014  23979 0
-23975  23976 -23977  1014 -23980 0

c  -2-1 --> break 
c    ( b^{338, 3}_2 ∧  b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧ -p_1014) -> break
c  in CNF:
c    -b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨  b^{338, 3}_0 ∨  p_1014 ∨ break
c  in DIMACS:
-23975 -23976  23977  1014 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{338, 3}_2 ∧ -b^{338, 3}_1 ∧ -b^{338, 3}_0 ∧ true) 
c  in CNF:
c    -b^{338, 3}_2 ∨  b^{338, 3}_1 ∨  b^{338, 3}_0 ∨ false 
c  in DIMACS:
-23975  23976  23977  0

c  3 does not represent an automaton state.
c    -(-b^{338, 3}_2 ∧  b^{338, 3}_1 ∧  b^{338, 3}_0 ∧ true) 
c  in CNF:
c     b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ false 
c  in DIMACS:
 23975 -23976 -23977  0
c  -3 does not represent an automaton state.
c    -( b^{338, 3}_2 ∧  b^{338, 3}_1 ∧  b^{338, 3}_0 ∧ true) 
c  in CNF:
c    -b^{338, 3}_2 ∨ -b^{338, 3}_1 ∨ -b^{338, 3}_0 ∨ false 
c  in DIMACS:
-23975 -23976 -23977  0

c INIT for k = 339
c    -b^{339, 1}_2
c    -b^{339, 1}_1
c    -b^{339, 1}_0
c  in DIMACS:
-23981 0
-23982 0
-23983 0

c Transitions for k = 339
c i = 1
c  -2+1 --> -1
c    ( b^{339, 1}_2 ∧  b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧  p_339) -> ( b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0)
c  in CNF:
c    -b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨  b^{339, 2}_2
c    -b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_1
c    -b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨  b^{339, 2}_0
c  in DIMACS:
-23981 -23982  23983 -339  23984 0
-23981 -23982  23983 -339 -23985 0
-23981 -23982  23983 -339  23986 0

c  -1+1 --> 0
c    ( b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧  b^{339, 1}_0 ∧  p_339) -> (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧ -b^{339, 2}_0)
c  in CNF:
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_2
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_1
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_0
c  in DIMACS:
-23981  23982 -23983 -339 -23984 0
-23981  23982 -23983 -339 -23985 0
-23981  23982 -23983 -339 -23986 0

c  0+1 --> 1
c    (-b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧  p_339) -> (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0)
c  in CNF:
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_2
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_1
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨  b^{339, 2}_0
c  in DIMACS:
 23981  23982  23983 -339 -23984 0
 23981  23982  23983 -339 -23985 0
 23981  23982  23983 -339  23986 0

c  1+1 --> 2
c    (-b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧  b^{339, 1}_0 ∧  p_339) -> (-b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0)
c  in CNF:
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_2
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨  b^{339, 2}_1
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ -p_339 ∨ -b^{339, 2}_0
c  in DIMACS:
 23981  23982 -23983 -339 -23984 0
 23981  23982 -23983 -339  23985 0
 23981  23982 -23983 -339 -23986 0

c  2+1 --> break 
c    (-b^{339, 1}_2 ∧  b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧  p_339) -> break
c  in CNF:
c     b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ -p_339 ∨ break
c  in DIMACS:
 23981 -23982  23983 -339 1162 0


c  2-1 --> 1
c    (-b^{339, 1}_2 ∧  b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧ -p_339) -> (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0)
c  in CNF:
c     b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_2
c     b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_1
c     b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨  b^{339, 2}_0
c  in DIMACS:
 23981 -23982  23983  339 -23984 0
 23981 -23982  23983  339 -23985 0
 23981 -23982  23983  339  23986 0

c  1-1 --> 0
c    (-b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧  b^{339, 1}_0 ∧ -p_339) -> (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧ -b^{339, 2}_0)
c  in CNF:
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_2
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_1
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_0
c  in DIMACS:
 23981  23982 -23983  339 -23984 0
 23981  23982 -23983  339 -23985 0
 23981  23982 -23983  339 -23986 0

c  0-1 --> -1
c    (-b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧ -p_339) -> ( b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0)
c  in CNF:
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨  b^{339, 2}_2
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_1
c     b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨  b^{339, 2}_0
c  in DIMACS:
 23981  23982  23983  339  23984 0
 23981  23982  23983  339 -23985 0
 23981  23982  23983  339  23986 0

c  -1-1 --> -2
c    ( b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧  b^{339, 1}_0 ∧ -p_339) -> ( b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0)
c  in CNF:
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨  b^{339, 2}_2
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨  b^{339, 2}_1
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨  p_339 ∨ -b^{339, 2}_0
c  in DIMACS:
-23981  23982 -23983  339  23984 0
-23981  23982 -23983  339  23985 0
-23981  23982 -23983  339 -23986 0

c  -2-1 --> break 
c    ( b^{339, 1}_2 ∧  b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧ -p_339) -> break
c  in CNF:
c    -b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨  b^{339, 1}_0 ∨  p_339 ∨ break
c  in DIMACS:
-23981 -23982  23983  339 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{339, 1}_2 ∧ -b^{339, 1}_1 ∧ -b^{339, 1}_0 ∧ true) 
c  in CNF:
c    -b^{339, 1}_2 ∨  b^{339, 1}_1 ∨  b^{339, 1}_0 ∨ false 
c  in DIMACS:
-23981  23982  23983  0

c  3 does not represent an automaton state.
c    -(-b^{339, 1}_2 ∧  b^{339, 1}_1 ∧  b^{339, 1}_0 ∧ true) 
c  in CNF:
c     b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ false 
c  in DIMACS:
 23981 -23982 -23983  0
c  -3 does not represent an automaton state.
c    -( b^{339, 1}_2 ∧  b^{339, 1}_1 ∧  b^{339, 1}_0 ∧ true) 
c  in CNF:
c    -b^{339, 1}_2 ∨ -b^{339, 1}_1 ∨ -b^{339, 1}_0 ∨ false 
c  in DIMACS:
-23981 -23982 -23983  0

c i = 2
c  -2+1 --> -1
c    ( b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧  p_678) -> ( b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0)
c  in CNF:
c    -b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨  b^{339, 3}_2
c    -b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_1
c    -b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨  b^{339, 3}_0
c  in DIMACS:
-23984 -23985  23986 -678  23987 0
-23984 -23985  23986 -678 -23988 0
-23984 -23985  23986 -678  23989 0

c  -1+1 --> 0
c    ( b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0 ∧  p_678) -> (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧ -b^{339, 3}_0)
c  in CNF:
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_2
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_1
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_0
c  in DIMACS:
-23984  23985 -23986 -678 -23987 0
-23984  23985 -23986 -678 -23988 0
-23984  23985 -23986 -678 -23989 0

c  0+1 --> 1
c    (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧  p_678) -> (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0)
c  in CNF:
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_2
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_1
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨  b^{339, 3}_0
c  in DIMACS:
 23984  23985  23986 -678 -23987 0
 23984  23985  23986 -678 -23988 0
 23984  23985  23986 -678  23989 0

c  1+1 --> 2
c    (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0 ∧  p_678) -> (-b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0)
c  in CNF:
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_2
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨  b^{339, 3}_1
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ -p_678 ∨ -b^{339, 3}_0
c  in DIMACS:
 23984  23985 -23986 -678 -23987 0
 23984  23985 -23986 -678  23988 0
 23984  23985 -23986 -678 -23989 0

c  2+1 --> break 
c    (-b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧  p_678) -> break
c  in CNF:
c     b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ -p_678 ∨ break
c  in DIMACS:
 23984 -23985  23986 -678 1162 0


c  2-1 --> 1
c    (-b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧ -p_678) -> (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0)
c  in CNF:
c     b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_2
c     b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_1
c     b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨  b^{339, 3}_0
c  in DIMACS:
 23984 -23985  23986  678 -23987 0
 23984 -23985  23986  678 -23988 0
 23984 -23985  23986  678  23989 0

c  1-1 --> 0
c    (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0 ∧ -p_678) -> (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧ -b^{339, 3}_0)
c  in CNF:
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_2
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_1
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_0
c  in DIMACS:
 23984  23985 -23986  678 -23987 0
 23984  23985 -23986  678 -23988 0
 23984  23985 -23986  678 -23989 0

c  0-1 --> -1
c    (-b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧ -p_678) -> ( b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0)
c  in CNF:
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨  b^{339, 3}_2
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_1
c     b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨  b^{339, 3}_0
c  in DIMACS:
 23984  23985  23986  678  23987 0
 23984  23985  23986  678 -23988 0
 23984  23985  23986  678  23989 0

c  -1-1 --> -2
c    ( b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧  b^{339, 2}_0 ∧ -p_678) -> ( b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0)
c  in CNF:
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨  b^{339, 3}_2
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨  b^{339, 3}_1
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨  p_678 ∨ -b^{339, 3}_0
c  in DIMACS:
-23984  23985 -23986  678  23987 0
-23984  23985 -23986  678  23988 0
-23984  23985 -23986  678 -23989 0

c  -2-1 --> break 
c    ( b^{339, 2}_2 ∧  b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧ -p_678) -> break
c  in CNF:
c    -b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨  b^{339, 2}_0 ∨  p_678 ∨ break
c  in DIMACS:
-23984 -23985  23986  678 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{339, 2}_2 ∧ -b^{339, 2}_1 ∧ -b^{339, 2}_0 ∧ true) 
c  in CNF:
c    -b^{339, 2}_2 ∨  b^{339, 2}_1 ∨  b^{339, 2}_0 ∨ false 
c  in DIMACS:
-23984  23985  23986  0

c  3 does not represent an automaton state.
c    -(-b^{339, 2}_2 ∧  b^{339, 2}_1 ∧  b^{339, 2}_0 ∧ true) 
c  in CNF:
c     b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ false 
c  in DIMACS:
 23984 -23985 -23986  0
c  -3 does not represent an automaton state.
c    -( b^{339, 2}_2 ∧  b^{339, 2}_1 ∧  b^{339, 2}_0 ∧ true) 
c  in CNF:
c    -b^{339, 2}_2 ∨ -b^{339, 2}_1 ∨ -b^{339, 2}_0 ∨ false 
c  in DIMACS:
-23984 -23985 -23986  0

c i = 3
c  -2+1 --> -1
c    ( b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧  p_1017) -> ( b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧  b^{339, 4}_0)
c  in CNF:
c    -b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨  b^{339, 4}_2
c    -b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_1
c    -b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨  b^{339, 4}_0
c  in DIMACS:
-23987 -23988  23989 -1017  23990 0
-23987 -23988  23989 -1017 -23991 0
-23987 -23988  23989 -1017  23992 0

c  -1+1 --> 0
c    ( b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0 ∧  p_1017) -> (-b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧ -b^{339, 4}_0)
c  in CNF:
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_2
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_1
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_0
c  in DIMACS:
-23987  23988 -23989 -1017 -23990 0
-23987  23988 -23989 -1017 -23991 0
-23987  23988 -23989 -1017 -23992 0

c  0+1 --> 1
c    (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧  p_1017) -> (-b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧  b^{339, 4}_0)
c  in CNF:
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_2
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_1
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨  b^{339, 4}_0
c  in DIMACS:
 23987  23988  23989 -1017 -23990 0
 23987  23988  23989 -1017 -23991 0
 23987  23988  23989 -1017  23992 0

c  1+1 --> 2
c    (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0 ∧  p_1017) -> (-b^{339, 4}_2 ∧  b^{339, 4}_1 ∧ -b^{339, 4}_0)
c  in CNF:
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_2
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨  b^{339, 4}_1
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ -p_1017 ∨ -b^{339, 4}_0
c  in DIMACS:
 23987  23988 -23989 -1017 -23990 0
 23987  23988 -23989 -1017  23991 0
 23987  23988 -23989 -1017 -23992 0

c  2+1 --> break 
c    (-b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧  p_1017) -> break
c  in CNF:
c     b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ -p_1017 ∨ break
c  in DIMACS:
 23987 -23988  23989 -1017 1162 0


c  2-1 --> 1
c    (-b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧ -p_1017) -> (-b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧  b^{339, 4}_0)
c  in CNF:
c     b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_2
c     b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_1
c     b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨  b^{339, 4}_0
c  in DIMACS:
 23987 -23988  23989  1017 -23990 0
 23987 -23988  23989  1017 -23991 0
 23987 -23988  23989  1017  23992 0

c  1-1 --> 0
c    (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0 ∧ -p_1017) -> (-b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧ -b^{339, 4}_0)
c  in CNF:
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_2
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_1
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_0
c  in DIMACS:
 23987  23988 -23989  1017 -23990 0
 23987  23988 -23989  1017 -23991 0
 23987  23988 -23989  1017 -23992 0

c  0-1 --> -1
c    (-b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧ -p_1017) -> ( b^{339, 4}_2 ∧ -b^{339, 4}_1 ∧  b^{339, 4}_0)
c  in CNF:
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨  b^{339, 4}_2
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_1
c     b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨  b^{339, 4}_0
c  in DIMACS:
 23987  23988  23989  1017  23990 0
 23987  23988  23989  1017 -23991 0
 23987  23988  23989  1017  23992 0

c  -1-1 --> -2
c    ( b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧  b^{339, 3}_0 ∧ -p_1017) -> ( b^{339, 4}_2 ∧  b^{339, 4}_1 ∧ -b^{339, 4}_0)
c  in CNF:
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨  b^{339, 4}_2
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨  b^{339, 4}_1
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨  p_1017 ∨ -b^{339, 4}_0
c  in DIMACS:
-23987  23988 -23989  1017  23990 0
-23987  23988 -23989  1017  23991 0
-23987  23988 -23989  1017 -23992 0

c  -2-1 --> break 
c    ( b^{339, 3}_2 ∧  b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧ -p_1017) -> break
c  in CNF:
c    -b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨  b^{339, 3}_0 ∨  p_1017 ∨ break
c  in DIMACS:
-23987 -23988  23989  1017 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{339, 3}_2 ∧ -b^{339, 3}_1 ∧ -b^{339, 3}_0 ∧ true) 
c  in CNF:
c    -b^{339, 3}_2 ∨  b^{339, 3}_1 ∨  b^{339, 3}_0 ∨ false 
c  in DIMACS:
-23987  23988  23989  0

c  3 does not represent an automaton state.
c    -(-b^{339, 3}_2 ∧  b^{339, 3}_1 ∧  b^{339, 3}_0 ∧ true) 
c  in CNF:
c     b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ false 
c  in DIMACS:
 23987 -23988 -23989  0
c  -3 does not represent an automaton state.
c    -( b^{339, 3}_2 ∧  b^{339, 3}_1 ∧  b^{339, 3}_0 ∧ true) 
c  in CNF:
c    -b^{339, 3}_2 ∨ -b^{339, 3}_1 ∨ -b^{339, 3}_0 ∨ false 
c  in DIMACS:
-23987 -23988 -23989  0

c INIT for k = 340
c    -b^{340, 1}_2
c    -b^{340, 1}_1
c    -b^{340, 1}_0
c  in DIMACS:
-23993 0
-23994 0
-23995 0

c Transitions for k = 340
c i = 1
c  -2+1 --> -1
c    ( b^{340, 1}_2 ∧  b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧  p_340) -> ( b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0)
c  in CNF:
c    -b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨  b^{340, 2}_2
c    -b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_1
c    -b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨  b^{340, 2}_0
c  in DIMACS:
-23993 -23994  23995 -340  23996 0
-23993 -23994  23995 -340 -23997 0
-23993 -23994  23995 -340  23998 0

c  -1+1 --> 0
c    ( b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧  b^{340, 1}_0 ∧  p_340) -> (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧ -b^{340, 2}_0)
c  in CNF:
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_2
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_1
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_0
c  in DIMACS:
-23993  23994 -23995 -340 -23996 0
-23993  23994 -23995 -340 -23997 0
-23993  23994 -23995 -340 -23998 0

c  0+1 --> 1
c    (-b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧  p_340) -> (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0)
c  in CNF:
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_2
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_1
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨  b^{340, 2}_0
c  in DIMACS:
 23993  23994  23995 -340 -23996 0
 23993  23994  23995 -340 -23997 0
 23993  23994  23995 -340  23998 0

c  1+1 --> 2
c    (-b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧  b^{340, 1}_0 ∧  p_340) -> (-b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0)
c  in CNF:
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_2
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨  b^{340, 2}_1
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ -p_340 ∨ -b^{340, 2}_0
c  in DIMACS:
 23993  23994 -23995 -340 -23996 0
 23993  23994 -23995 -340  23997 0
 23993  23994 -23995 -340 -23998 0

c  2+1 --> break 
c    (-b^{340, 1}_2 ∧  b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧  p_340) -> break
c  in CNF:
c     b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ -p_340 ∨ break
c  in DIMACS:
 23993 -23994  23995 -340 1162 0


c  2-1 --> 1
c    (-b^{340, 1}_2 ∧  b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧ -p_340) -> (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0)
c  in CNF:
c     b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_2
c     b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_1
c     b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨  b^{340, 2}_0
c  in DIMACS:
 23993 -23994  23995  340 -23996 0
 23993 -23994  23995  340 -23997 0
 23993 -23994  23995  340  23998 0

c  1-1 --> 0
c    (-b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧  b^{340, 1}_0 ∧ -p_340) -> (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧ -b^{340, 2}_0)
c  in CNF:
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_2
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_1
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_0
c  in DIMACS:
 23993  23994 -23995  340 -23996 0
 23993  23994 -23995  340 -23997 0
 23993  23994 -23995  340 -23998 0

c  0-1 --> -1
c    (-b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧ -p_340) -> ( b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0)
c  in CNF:
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨  b^{340, 2}_2
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_1
c     b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨  b^{340, 2}_0
c  in DIMACS:
 23993  23994  23995  340  23996 0
 23993  23994  23995  340 -23997 0
 23993  23994  23995  340  23998 0

c  -1-1 --> -2
c    ( b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧  b^{340, 1}_0 ∧ -p_340) -> ( b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0)
c  in CNF:
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨  b^{340, 2}_2
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨  b^{340, 2}_1
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨  p_340 ∨ -b^{340, 2}_0
c  in DIMACS:
-23993  23994 -23995  340  23996 0
-23993  23994 -23995  340  23997 0
-23993  23994 -23995  340 -23998 0

c  -2-1 --> break 
c    ( b^{340, 1}_2 ∧  b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧ -p_340) -> break
c  in CNF:
c    -b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨  b^{340, 1}_0 ∨  p_340 ∨ break
c  in DIMACS:
-23993 -23994  23995  340 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{340, 1}_2 ∧ -b^{340, 1}_1 ∧ -b^{340, 1}_0 ∧ true) 
c  in CNF:
c    -b^{340, 1}_2 ∨  b^{340, 1}_1 ∨  b^{340, 1}_0 ∨ false 
c  in DIMACS:
-23993  23994  23995  0

c  3 does not represent an automaton state.
c    -(-b^{340, 1}_2 ∧  b^{340, 1}_1 ∧  b^{340, 1}_0 ∧ true) 
c  in CNF:
c     b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ false 
c  in DIMACS:
 23993 -23994 -23995  0
c  -3 does not represent an automaton state.
c    -( b^{340, 1}_2 ∧  b^{340, 1}_1 ∧  b^{340, 1}_0 ∧ true) 
c  in CNF:
c    -b^{340, 1}_2 ∨ -b^{340, 1}_1 ∨ -b^{340, 1}_0 ∨ false 
c  in DIMACS:
-23993 -23994 -23995  0

c i = 2
c  -2+1 --> -1
c    ( b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧  p_680) -> ( b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0)
c  in CNF:
c    -b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨  b^{340, 3}_2
c    -b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_1
c    -b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨  b^{340, 3}_0
c  in DIMACS:
-23996 -23997  23998 -680  23999 0
-23996 -23997  23998 -680 -24000 0
-23996 -23997  23998 -680  24001 0

c  -1+1 --> 0
c    ( b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0 ∧  p_680) -> (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧ -b^{340, 3}_0)
c  in CNF:
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_2
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_1
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_0
c  in DIMACS:
-23996  23997 -23998 -680 -23999 0
-23996  23997 -23998 -680 -24000 0
-23996  23997 -23998 -680 -24001 0

c  0+1 --> 1
c    (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧  p_680) -> (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0)
c  in CNF:
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_2
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_1
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨  b^{340, 3}_0
c  in DIMACS:
 23996  23997  23998 -680 -23999 0
 23996  23997  23998 -680 -24000 0
 23996  23997  23998 -680  24001 0

c  1+1 --> 2
c    (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0 ∧  p_680) -> (-b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0)
c  in CNF:
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_2
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨  b^{340, 3}_1
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ -p_680 ∨ -b^{340, 3}_0
c  in DIMACS:
 23996  23997 -23998 -680 -23999 0
 23996  23997 -23998 -680  24000 0
 23996  23997 -23998 -680 -24001 0

c  2+1 --> break 
c    (-b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧  p_680) -> break
c  in CNF:
c     b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ -p_680 ∨ break
c  in DIMACS:
 23996 -23997  23998 -680 1162 0


c  2-1 --> 1
c    (-b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧ -p_680) -> (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0)
c  in CNF:
c     b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_2
c     b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_1
c     b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨  b^{340, 3}_0
c  in DIMACS:
 23996 -23997  23998  680 -23999 0
 23996 -23997  23998  680 -24000 0
 23996 -23997  23998  680  24001 0

c  1-1 --> 0
c    (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0 ∧ -p_680) -> (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧ -b^{340, 3}_0)
c  in CNF:
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_2
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_1
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_0
c  in DIMACS:
 23996  23997 -23998  680 -23999 0
 23996  23997 -23998  680 -24000 0
 23996  23997 -23998  680 -24001 0

c  0-1 --> -1
c    (-b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧ -p_680) -> ( b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0)
c  in CNF:
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨  b^{340, 3}_2
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_1
c     b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨  b^{340, 3}_0
c  in DIMACS:
 23996  23997  23998  680  23999 0
 23996  23997  23998  680 -24000 0
 23996  23997  23998  680  24001 0

c  -1-1 --> -2
c    ( b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧  b^{340, 2}_0 ∧ -p_680) -> ( b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0)
c  in CNF:
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨  b^{340, 3}_2
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨  b^{340, 3}_1
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨  p_680 ∨ -b^{340, 3}_0
c  in DIMACS:
-23996  23997 -23998  680  23999 0
-23996  23997 -23998  680  24000 0
-23996  23997 -23998  680 -24001 0

c  -2-1 --> break 
c    ( b^{340, 2}_2 ∧  b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧ -p_680) -> break
c  in CNF:
c    -b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨  b^{340, 2}_0 ∨  p_680 ∨ break
c  in DIMACS:
-23996 -23997  23998  680 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{340, 2}_2 ∧ -b^{340, 2}_1 ∧ -b^{340, 2}_0 ∧ true) 
c  in CNF:
c    -b^{340, 2}_2 ∨  b^{340, 2}_1 ∨  b^{340, 2}_0 ∨ false 
c  in DIMACS:
-23996  23997  23998  0

c  3 does not represent an automaton state.
c    -(-b^{340, 2}_2 ∧  b^{340, 2}_1 ∧  b^{340, 2}_0 ∧ true) 
c  in CNF:
c     b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ false 
c  in DIMACS:
 23996 -23997 -23998  0
c  -3 does not represent an automaton state.
c    -( b^{340, 2}_2 ∧  b^{340, 2}_1 ∧  b^{340, 2}_0 ∧ true) 
c  in CNF:
c    -b^{340, 2}_2 ∨ -b^{340, 2}_1 ∨ -b^{340, 2}_0 ∨ false 
c  in DIMACS:
-23996 -23997 -23998  0

c i = 3
c  -2+1 --> -1
c    ( b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧  p_1020) -> ( b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧  b^{340, 4}_0)
c  in CNF:
c    -b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨  b^{340, 4}_2
c    -b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_1
c    -b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨  b^{340, 4}_0
c  in DIMACS:
-23999 -24000  24001 -1020  24002 0
-23999 -24000  24001 -1020 -24003 0
-23999 -24000  24001 -1020  24004 0

c  -1+1 --> 0
c    ( b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0 ∧  p_1020) -> (-b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧ -b^{340, 4}_0)
c  in CNF:
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_2
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_1
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_0
c  in DIMACS:
-23999  24000 -24001 -1020 -24002 0
-23999  24000 -24001 -1020 -24003 0
-23999  24000 -24001 -1020 -24004 0

c  0+1 --> 1
c    (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧  p_1020) -> (-b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧  b^{340, 4}_0)
c  in CNF:
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_2
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_1
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨  b^{340, 4}_0
c  in DIMACS:
 23999  24000  24001 -1020 -24002 0
 23999  24000  24001 -1020 -24003 0
 23999  24000  24001 -1020  24004 0

c  1+1 --> 2
c    (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0 ∧  p_1020) -> (-b^{340, 4}_2 ∧  b^{340, 4}_1 ∧ -b^{340, 4}_0)
c  in CNF:
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_2
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨  b^{340, 4}_1
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ -p_1020 ∨ -b^{340, 4}_0
c  in DIMACS:
 23999  24000 -24001 -1020 -24002 0
 23999  24000 -24001 -1020  24003 0
 23999  24000 -24001 -1020 -24004 0

c  2+1 --> break 
c    (-b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧  p_1020) -> break
c  in CNF:
c     b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ -p_1020 ∨ break
c  in DIMACS:
 23999 -24000  24001 -1020 1162 0


c  2-1 --> 1
c    (-b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧ -p_1020) -> (-b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧  b^{340, 4}_0)
c  in CNF:
c     b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_2
c     b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_1
c     b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨  b^{340, 4}_0
c  in DIMACS:
 23999 -24000  24001  1020 -24002 0
 23999 -24000  24001  1020 -24003 0
 23999 -24000  24001  1020  24004 0

c  1-1 --> 0
c    (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0 ∧ -p_1020) -> (-b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧ -b^{340, 4}_0)
c  in CNF:
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_2
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_1
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_0
c  in DIMACS:
 23999  24000 -24001  1020 -24002 0
 23999  24000 -24001  1020 -24003 0
 23999  24000 -24001  1020 -24004 0

c  0-1 --> -1
c    (-b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧ -p_1020) -> ( b^{340, 4}_2 ∧ -b^{340, 4}_1 ∧  b^{340, 4}_0)
c  in CNF:
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨  b^{340, 4}_2
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_1
c     b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨  b^{340, 4}_0
c  in DIMACS:
 23999  24000  24001  1020  24002 0
 23999  24000  24001  1020 -24003 0
 23999  24000  24001  1020  24004 0

c  -1-1 --> -2
c    ( b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧  b^{340, 3}_0 ∧ -p_1020) -> ( b^{340, 4}_2 ∧  b^{340, 4}_1 ∧ -b^{340, 4}_0)
c  in CNF:
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨  b^{340, 4}_2
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨  b^{340, 4}_1
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨  p_1020 ∨ -b^{340, 4}_0
c  in DIMACS:
-23999  24000 -24001  1020  24002 0
-23999  24000 -24001  1020  24003 0
-23999  24000 -24001  1020 -24004 0

c  -2-1 --> break 
c    ( b^{340, 3}_2 ∧  b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧ -p_1020) -> break
c  in CNF:
c    -b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨  b^{340, 3}_0 ∨  p_1020 ∨ break
c  in DIMACS:
-23999 -24000  24001  1020 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{340, 3}_2 ∧ -b^{340, 3}_1 ∧ -b^{340, 3}_0 ∧ true) 
c  in CNF:
c    -b^{340, 3}_2 ∨  b^{340, 3}_1 ∨  b^{340, 3}_0 ∨ false 
c  in DIMACS:
-23999  24000  24001  0

c  3 does not represent an automaton state.
c    -(-b^{340, 3}_2 ∧  b^{340, 3}_1 ∧  b^{340, 3}_0 ∧ true) 
c  in CNF:
c     b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ false 
c  in DIMACS:
 23999 -24000 -24001  0
c  -3 does not represent an automaton state.
c    -( b^{340, 3}_2 ∧  b^{340, 3}_1 ∧  b^{340, 3}_0 ∧ true) 
c  in CNF:
c    -b^{340, 3}_2 ∨ -b^{340, 3}_1 ∨ -b^{340, 3}_0 ∨ false 
c  in DIMACS:
-23999 -24000 -24001  0

c INIT for k = 341
c    -b^{341, 1}_2
c    -b^{341, 1}_1
c    -b^{341, 1}_0
c  in DIMACS:
-24005 0
-24006 0
-24007 0

c Transitions for k = 341
c i = 1
c  -2+1 --> -1
c    ( b^{341, 1}_2 ∧  b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧  p_341) -> ( b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0)
c  in CNF:
c    -b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨  b^{341, 2}_2
c    -b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_1
c    -b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨  b^{341, 2}_0
c  in DIMACS:
-24005 -24006  24007 -341  24008 0
-24005 -24006  24007 -341 -24009 0
-24005 -24006  24007 -341  24010 0

c  -1+1 --> 0
c    ( b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧  b^{341, 1}_0 ∧  p_341) -> (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧ -b^{341, 2}_0)
c  in CNF:
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_2
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_1
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_0
c  in DIMACS:
-24005  24006 -24007 -341 -24008 0
-24005  24006 -24007 -341 -24009 0
-24005  24006 -24007 -341 -24010 0

c  0+1 --> 1
c    (-b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧  p_341) -> (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0)
c  in CNF:
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_2
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_1
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨  b^{341, 2}_0
c  in DIMACS:
 24005  24006  24007 -341 -24008 0
 24005  24006  24007 -341 -24009 0
 24005  24006  24007 -341  24010 0

c  1+1 --> 2
c    (-b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧  b^{341, 1}_0 ∧  p_341) -> (-b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0)
c  in CNF:
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_2
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨  b^{341, 2}_1
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ -p_341 ∨ -b^{341, 2}_0
c  in DIMACS:
 24005  24006 -24007 -341 -24008 0
 24005  24006 -24007 -341  24009 0
 24005  24006 -24007 -341 -24010 0

c  2+1 --> break 
c    (-b^{341, 1}_2 ∧  b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧  p_341) -> break
c  in CNF:
c     b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ -p_341 ∨ break
c  in DIMACS:
 24005 -24006  24007 -341 1162 0


c  2-1 --> 1
c    (-b^{341, 1}_2 ∧  b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧ -p_341) -> (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0)
c  in CNF:
c     b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_2
c     b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_1
c     b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨  b^{341, 2}_0
c  in DIMACS:
 24005 -24006  24007  341 -24008 0
 24005 -24006  24007  341 -24009 0
 24005 -24006  24007  341  24010 0

c  1-1 --> 0
c    (-b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧  b^{341, 1}_0 ∧ -p_341) -> (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧ -b^{341, 2}_0)
c  in CNF:
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_2
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_1
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_0
c  in DIMACS:
 24005  24006 -24007  341 -24008 0
 24005  24006 -24007  341 -24009 0
 24005  24006 -24007  341 -24010 0

c  0-1 --> -1
c    (-b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧ -p_341) -> ( b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0)
c  in CNF:
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨  b^{341, 2}_2
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_1
c     b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨  b^{341, 2}_0
c  in DIMACS:
 24005  24006  24007  341  24008 0
 24005  24006  24007  341 -24009 0
 24005  24006  24007  341  24010 0

c  -1-1 --> -2
c    ( b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧  b^{341, 1}_0 ∧ -p_341) -> ( b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0)
c  in CNF:
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨  b^{341, 2}_2
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨  b^{341, 2}_1
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨  p_341 ∨ -b^{341, 2}_0
c  in DIMACS:
-24005  24006 -24007  341  24008 0
-24005  24006 -24007  341  24009 0
-24005  24006 -24007  341 -24010 0

c  -2-1 --> break 
c    ( b^{341, 1}_2 ∧  b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧ -p_341) -> break
c  in CNF:
c    -b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨  b^{341, 1}_0 ∨  p_341 ∨ break
c  in DIMACS:
-24005 -24006  24007  341 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{341, 1}_2 ∧ -b^{341, 1}_1 ∧ -b^{341, 1}_0 ∧ true) 
c  in CNF:
c    -b^{341, 1}_2 ∨  b^{341, 1}_1 ∨  b^{341, 1}_0 ∨ false 
c  in DIMACS:
-24005  24006  24007  0

c  3 does not represent an automaton state.
c    -(-b^{341, 1}_2 ∧  b^{341, 1}_1 ∧  b^{341, 1}_0 ∧ true) 
c  in CNF:
c     b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ false 
c  in DIMACS:
 24005 -24006 -24007  0
c  -3 does not represent an automaton state.
c    -( b^{341, 1}_2 ∧  b^{341, 1}_1 ∧  b^{341, 1}_0 ∧ true) 
c  in CNF:
c    -b^{341, 1}_2 ∨ -b^{341, 1}_1 ∨ -b^{341, 1}_0 ∨ false 
c  in DIMACS:
-24005 -24006 -24007  0

c i = 2
c  -2+1 --> -1
c    ( b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧  p_682) -> ( b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0)
c  in CNF:
c    -b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨  b^{341, 3}_2
c    -b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_1
c    -b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨  b^{341, 3}_0
c  in DIMACS:
-24008 -24009  24010 -682  24011 0
-24008 -24009  24010 -682 -24012 0
-24008 -24009  24010 -682  24013 0

c  -1+1 --> 0
c    ( b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0 ∧  p_682) -> (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧ -b^{341, 3}_0)
c  in CNF:
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_2
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_1
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_0
c  in DIMACS:
-24008  24009 -24010 -682 -24011 0
-24008  24009 -24010 -682 -24012 0
-24008  24009 -24010 -682 -24013 0

c  0+1 --> 1
c    (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧  p_682) -> (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0)
c  in CNF:
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_2
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_1
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨  b^{341, 3}_0
c  in DIMACS:
 24008  24009  24010 -682 -24011 0
 24008  24009  24010 -682 -24012 0
 24008  24009  24010 -682  24013 0

c  1+1 --> 2
c    (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0 ∧  p_682) -> (-b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0)
c  in CNF:
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_2
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨  b^{341, 3}_1
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ -p_682 ∨ -b^{341, 3}_0
c  in DIMACS:
 24008  24009 -24010 -682 -24011 0
 24008  24009 -24010 -682  24012 0
 24008  24009 -24010 -682 -24013 0

c  2+1 --> break 
c    (-b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧  p_682) -> break
c  in CNF:
c     b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ -p_682 ∨ break
c  in DIMACS:
 24008 -24009  24010 -682 1162 0


c  2-1 --> 1
c    (-b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧ -p_682) -> (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0)
c  in CNF:
c     b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_2
c     b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_1
c     b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨  b^{341, 3}_0
c  in DIMACS:
 24008 -24009  24010  682 -24011 0
 24008 -24009  24010  682 -24012 0
 24008 -24009  24010  682  24013 0

c  1-1 --> 0
c    (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0 ∧ -p_682) -> (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧ -b^{341, 3}_0)
c  in CNF:
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_2
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_1
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_0
c  in DIMACS:
 24008  24009 -24010  682 -24011 0
 24008  24009 -24010  682 -24012 0
 24008  24009 -24010  682 -24013 0

c  0-1 --> -1
c    (-b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧ -p_682) -> ( b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0)
c  in CNF:
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨  b^{341, 3}_2
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_1
c     b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨  b^{341, 3}_0
c  in DIMACS:
 24008  24009  24010  682  24011 0
 24008  24009  24010  682 -24012 0
 24008  24009  24010  682  24013 0

c  -1-1 --> -2
c    ( b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧  b^{341, 2}_0 ∧ -p_682) -> ( b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0)
c  in CNF:
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨  b^{341, 3}_2
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨  b^{341, 3}_1
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨  p_682 ∨ -b^{341, 3}_0
c  in DIMACS:
-24008  24009 -24010  682  24011 0
-24008  24009 -24010  682  24012 0
-24008  24009 -24010  682 -24013 0

c  -2-1 --> break 
c    ( b^{341, 2}_2 ∧  b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧ -p_682) -> break
c  in CNF:
c    -b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨  b^{341, 2}_0 ∨  p_682 ∨ break
c  in DIMACS:
-24008 -24009  24010  682 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{341, 2}_2 ∧ -b^{341, 2}_1 ∧ -b^{341, 2}_0 ∧ true) 
c  in CNF:
c    -b^{341, 2}_2 ∨  b^{341, 2}_1 ∨  b^{341, 2}_0 ∨ false 
c  in DIMACS:
-24008  24009  24010  0

c  3 does not represent an automaton state.
c    -(-b^{341, 2}_2 ∧  b^{341, 2}_1 ∧  b^{341, 2}_0 ∧ true) 
c  in CNF:
c     b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ false 
c  in DIMACS:
 24008 -24009 -24010  0
c  -3 does not represent an automaton state.
c    -( b^{341, 2}_2 ∧  b^{341, 2}_1 ∧  b^{341, 2}_0 ∧ true) 
c  in CNF:
c    -b^{341, 2}_2 ∨ -b^{341, 2}_1 ∨ -b^{341, 2}_0 ∨ false 
c  in DIMACS:
-24008 -24009 -24010  0

c i = 3
c  -2+1 --> -1
c    ( b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧  p_1023) -> ( b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧  b^{341, 4}_0)
c  in CNF:
c    -b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨  b^{341, 4}_2
c    -b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_1
c    -b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨  b^{341, 4}_0
c  in DIMACS:
-24011 -24012  24013 -1023  24014 0
-24011 -24012  24013 -1023 -24015 0
-24011 -24012  24013 -1023  24016 0

c  -1+1 --> 0
c    ( b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0 ∧  p_1023) -> (-b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧ -b^{341, 4}_0)
c  in CNF:
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_2
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_1
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_0
c  in DIMACS:
-24011  24012 -24013 -1023 -24014 0
-24011  24012 -24013 -1023 -24015 0
-24011  24012 -24013 -1023 -24016 0

c  0+1 --> 1
c    (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧  p_1023) -> (-b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧  b^{341, 4}_0)
c  in CNF:
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_2
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_1
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨  b^{341, 4}_0
c  in DIMACS:
 24011  24012  24013 -1023 -24014 0
 24011  24012  24013 -1023 -24015 0
 24011  24012  24013 -1023  24016 0

c  1+1 --> 2
c    (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0 ∧  p_1023) -> (-b^{341, 4}_2 ∧  b^{341, 4}_1 ∧ -b^{341, 4}_0)
c  in CNF:
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_2
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨  b^{341, 4}_1
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ -p_1023 ∨ -b^{341, 4}_0
c  in DIMACS:
 24011  24012 -24013 -1023 -24014 0
 24011  24012 -24013 -1023  24015 0
 24011  24012 -24013 -1023 -24016 0

c  2+1 --> break 
c    (-b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧  p_1023) -> break
c  in CNF:
c     b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ -p_1023 ∨ break
c  in DIMACS:
 24011 -24012  24013 -1023 1162 0


c  2-1 --> 1
c    (-b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧ -p_1023) -> (-b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧  b^{341, 4}_0)
c  in CNF:
c     b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_2
c     b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_1
c     b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨  b^{341, 4}_0
c  in DIMACS:
 24011 -24012  24013  1023 -24014 0
 24011 -24012  24013  1023 -24015 0
 24011 -24012  24013  1023  24016 0

c  1-1 --> 0
c    (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0 ∧ -p_1023) -> (-b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧ -b^{341, 4}_0)
c  in CNF:
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_2
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_1
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_0
c  in DIMACS:
 24011  24012 -24013  1023 -24014 0
 24011  24012 -24013  1023 -24015 0
 24011  24012 -24013  1023 -24016 0

c  0-1 --> -1
c    (-b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧ -p_1023) -> ( b^{341, 4}_2 ∧ -b^{341, 4}_1 ∧  b^{341, 4}_0)
c  in CNF:
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨  b^{341, 4}_2
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_1
c     b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨  b^{341, 4}_0
c  in DIMACS:
 24011  24012  24013  1023  24014 0
 24011  24012  24013  1023 -24015 0
 24011  24012  24013  1023  24016 0

c  -1-1 --> -2
c    ( b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧  b^{341, 3}_0 ∧ -p_1023) -> ( b^{341, 4}_2 ∧  b^{341, 4}_1 ∧ -b^{341, 4}_0)
c  in CNF:
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨  b^{341, 4}_2
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨  b^{341, 4}_1
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨  p_1023 ∨ -b^{341, 4}_0
c  in DIMACS:
-24011  24012 -24013  1023  24014 0
-24011  24012 -24013  1023  24015 0
-24011  24012 -24013  1023 -24016 0

c  -2-1 --> break 
c    ( b^{341, 3}_2 ∧  b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧ -p_1023) -> break
c  in CNF:
c    -b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨  b^{341, 3}_0 ∨  p_1023 ∨ break
c  in DIMACS:
-24011 -24012  24013  1023 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{341, 3}_2 ∧ -b^{341, 3}_1 ∧ -b^{341, 3}_0 ∧ true) 
c  in CNF:
c    -b^{341, 3}_2 ∨  b^{341, 3}_1 ∨  b^{341, 3}_0 ∨ false 
c  in DIMACS:
-24011  24012  24013  0

c  3 does not represent an automaton state.
c    -(-b^{341, 3}_2 ∧  b^{341, 3}_1 ∧  b^{341, 3}_0 ∧ true) 
c  in CNF:
c     b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ false 
c  in DIMACS:
 24011 -24012 -24013  0
c  -3 does not represent an automaton state.
c    -( b^{341, 3}_2 ∧  b^{341, 3}_1 ∧  b^{341, 3}_0 ∧ true) 
c  in CNF:
c    -b^{341, 3}_2 ∨ -b^{341, 3}_1 ∨ -b^{341, 3}_0 ∨ false 
c  in DIMACS:
-24011 -24012 -24013  0

c INIT for k = 342
c    -b^{342, 1}_2
c    -b^{342, 1}_1
c    -b^{342, 1}_0
c  in DIMACS:
-24017 0
-24018 0
-24019 0

c Transitions for k = 342
c i = 1
c  -2+1 --> -1
c    ( b^{342, 1}_2 ∧  b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧  p_342) -> ( b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0)
c  in CNF:
c    -b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨  b^{342, 2}_2
c    -b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_1
c    -b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨  b^{342, 2}_0
c  in DIMACS:
-24017 -24018  24019 -342  24020 0
-24017 -24018  24019 -342 -24021 0
-24017 -24018  24019 -342  24022 0

c  -1+1 --> 0
c    ( b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧  b^{342, 1}_0 ∧  p_342) -> (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧ -b^{342, 2}_0)
c  in CNF:
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_2
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_1
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_0
c  in DIMACS:
-24017  24018 -24019 -342 -24020 0
-24017  24018 -24019 -342 -24021 0
-24017  24018 -24019 -342 -24022 0

c  0+1 --> 1
c    (-b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧  p_342) -> (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0)
c  in CNF:
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_2
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_1
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨  b^{342, 2}_0
c  in DIMACS:
 24017  24018  24019 -342 -24020 0
 24017  24018  24019 -342 -24021 0
 24017  24018  24019 -342  24022 0

c  1+1 --> 2
c    (-b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧  b^{342, 1}_0 ∧  p_342) -> (-b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0)
c  in CNF:
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_2
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨  b^{342, 2}_1
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ -p_342 ∨ -b^{342, 2}_0
c  in DIMACS:
 24017  24018 -24019 -342 -24020 0
 24017  24018 -24019 -342  24021 0
 24017  24018 -24019 -342 -24022 0

c  2+1 --> break 
c    (-b^{342, 1}_2 ∧  b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧  p_342) -> break
c  in CNF:
c     b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ -p_342 ∨ break
c  in DIMACS:
 24017 -24018  24019 -342 1162 0


c  2-1 --> 1
c    (-b^{342, 1}_2 ∧  b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧ -p_342) -> (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0)
c  in CNF:
c     b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_2
c     b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_1
c     b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨  b^{342, 2}_0
c  in DIMACS:
 24017 -24018  24019  342 -24020 0
 24017 -24018  24019  342 -24021 0
 24017 -24018  24019  342  24022 0

c  1-1 --> 0
c    (-b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧  b^{342, 1}_0 ∧ -p_342) -> (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧ -b^{342, 2}_0)
c  in CNF:
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_2
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_1
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_0
c  in DIMACS:
 24017  24018 -24019  342 -24020 0
 24017  24018 -24019  342 -24021 0
 24017  24018 -24019  342 -24022 0

c  0-1 --> -1
c    (-b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧ -p_342) -> ( b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0)
c  in CNF:
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨  b^{342, 2}_2
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_1
c     b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨  b^{342, 2}_0
c  in DIMACS:
 24017  24018  24019  342  24020 0
 24017  24018  24019  342 -24021 0
 24017  24018  24019  342  24022 0

c  -1-1 --> -2
c    ( b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧  b^{342, 1}_0 ∧ -p_342) -> ( b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0)
c  in CNF:
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨  b^{342, 2}_2
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨  b^{342, 2}_1
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨  p_342 ∨ -b^{342, 2}_0
c  in DIMACS:
-24017  24018 -24019  342  24020 0
-24017  24018 -24019  342  24021 0
-24017  24018 -24019  342 -24022 0

c  -2-1 --> break 
c    ( b^{342, 1}_2 ∧  b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧ -p_342) -> break
c  in CNF:
c    -b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨  b^{342, 1}_0 ∨  p_342 ∨ break
c  in DIMACS:
-24017 -24018  24019  342 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{342, 1}_2 ∧ -b^{342, 1}_1 ∧ -b^{342, 1}_0 ∧ true) 
c  in CNF:
c    -b^{342, 1}_2 ∨  b^{342, 1}_1 ∨  b^{342, 1}_0 ∨ false 
c  in DIMACS:
-24017  24018  24019  0

c  3 does not represent an automaton state.
c    -(-b^{342, 1}_2 ∧  b^{342, 1}_1 ∧  b^{342, 1}_0 ∧ true) 
c  in CNF:
c     b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ false 
c  in DIMACS:
 24017 -24018 -24019  0
c  -3 does not represent an automaton state.
c    -( b^{342, 1}_2 ∧  b^{342, 1}_1 ∧  b^{342, 1}_0 ∧ true) 
c  in CNF:
c    -b^{342, 1}_2 ∨ -b^{342, 1}_1 ∨ -b^{342, 1}_0 ∨ false 
c  in DIMACS:
-24017 -24018 -24019  0

c i = 2
c  -2+1 --> -1
c    ( b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧  p_684) -> ( b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0)
c  in CNF:
c    -b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨  b^{342, 3}_2
c    -b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_1
c    -b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨  b^{342, 3}_0
c  in DIMACS:
-24020 -24021  24022 -684  24023 0
-24020 -24021  24022 -684 -24024 0
-24020 -24021  24022 -684  24025 0

c  -1+1 --> 0
c    ( b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0 ∧  p_684) -> (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧ -b^{342, 3}_0)
c  in CNF:
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_2
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_1
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_0
c  in DIMACS:
-24020  24021 -24022 -684 -24023 0
-24020  24021 -24022 -684 -24024 0
-24020  24021 -24022 -684 -24025 0

c  0+1 --> 1
c    (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧  p_684) -> (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0)
c  in CNF:
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_2
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_1
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨  b^{342, 3}_0
c  in DIMACS:
 24020  24021  24022 -684 -24023 0
 24020  24021  24022 -684 -24024 0
 24020  24021  24022 -684  24025 0

c  1+1 --> 2
c    (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0 ∧  p_684) -> (-b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0)
c  in CNF:
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_2
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨  b^{342, 3}_1
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ -p_684 ∨ -b^{342, 3}_0
c  in DIMACS:
 24020  24021 -24022 -684 -24023 0
 24020  24021 -24022 -684  24024 0
 24020  24021 -24022 -684 -24025 0

c  2+1 --> break 
c    (-b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧  p_684) -> break
c  in CNF:
c     b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ -p_684 ∨ break
c  in DIMACS:
 24020 -24021  24022 -684 1162 0


c  2-1 --> 1
c    (-b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧ -p_684) -> (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0)
c  in CNF:
c     b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_2
c     b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_1
c     b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨  b^{342, 3}_0
c  in DIMACS:
 24020 -24021  24022  684 -24023 0
 24020 -24021  24022  684 -24024 0
 24020 -24021  24022  684  24025 0

c  1-1 --> 0
c    (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0 ∧ -p_684) -> (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧ -b^{342, 3}_0)
c  in CNF:
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_2
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_1
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_0
c  in DIMACS:
 24020  24021 -24022  684 -24023 0
 24020  24021 -24022  684 -24024 0
 24020  24021 -24022  684 -24025 0

c  0-1 --> -1
c    (-b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧ -p_684) -> ( b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0)
c  in CNF:
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨  b^{342, 3}_2
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_1
c     b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨  b^{342, 3}_0
c  in DIMACS:
 24020  24021  24022  684  24023 0
 24020  24021  24022  684 -24024 0
 24020  24021  24022  684  24025 0

c  -1-1 --> -2
c    ( b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧  b^{342, 2}_0 ∧ -p_684) -> ( b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0)
c  in CNF:
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨  b^{342, 3}_2
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨  b^{342, 3}_1
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨  p_684 ∨ -b^{342, 3}_0
c  in DIMACS:
-24020  24021 -24022  684  24023 0
-24020  24021 -24022  684  24024 0
-24020  24021 -24022  684 -24025 0

c  -2-1 --> break 
c    ( b^{342, 2}_2 ∧  b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧ -p_684) -> break
c  in CNF:
c    -b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨  b^{342, 2}_0 ∨  p_684 ∨ break
c  in DIMACS:
-24020 -24021  24022  684 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{342, 2}_2 ∧ -b^{342, 2}_1 ∧ -b^{342, 2}_0 ∧ true) 
c  in CNF:
c    -b^{342, 2}_2 ∨  b^{342, 2}_1 ∨  b^{342, 2}_0 ∨ false 
c  in DIMACS:
-24020  24021  24022  0

c  3 does not represent an automaton state.
c    -(-b^{342, 2}_2 ∧  b^{342, 2}_1 ∧  b^{342, 2}_0 ∧ true) 
c  in CNF:
c     b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ false 
c  in DIMACS:
 24020 -24021 -24022  0
c  -3 does not represent an automaton state.
c    -( b^{342, 2}_2 ∧  b^{342, 2}_1 ∧  b^{342, 2}_0 ∧ true) 
c  in CNF:
c    -b^{342, 2}_2 ∨ -b^{342, 2}_1 ∨ -b^{342, 2}_0 ∨ false 
c  in DIMACS:
-24020 -24021 -24022  0

c i = 3
c  -2+1 --> -1
c    ( b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧  p_1026) -> ( b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧  b^{342, 4}_0)
c  in CNF:
c    -b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨  b^{342, 4}_2
c    -b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_1
c    -b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨  b^{342, 4}_0
c  in DIMACS:
-24023 -24024  24025 -1026  24026 0
-24023 -24024  24025 -1026 -24027 0
-24023 -24024  24025 -1026  24028 0

c  -1+1 --> 0
c    ( b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0 ∧  p_1026) -> (-b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧ -b^{342, 4}_0)
c  in CNF:
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_2
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_1
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_0
c  in DIMACS:
-24023  24024 -24025 -1026 -24026 0
-24023  24024 -24025 -1026 -24027 0
-24023  24024 -24025 -1026 -24028 0

c  0+1 --> 1
c    (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧  p_1026) -> (-b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧  b^{342, 4}_0)
c  in CNF:
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_2
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_1
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨  b^{342, 4}_0
c  in DIMACS:
 24023  24024  24025 -1026 -24026 0
 24023  24024  24025 -1026 -24027 0
 24023  24024  24025 -1026  24028 0

c  1+1 --> 2
c    (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0 ∧  p_1026) -> (-b^{342, 4}_2 ∧  b^{342, 4}_1 ∧ -b^{342, 4}_0)
c  in CNF:
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_2
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨  b^{342, 4}_1
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ -p_1026 ∨ -b^{342, 4}_0
c  in DIMACS:
 24023  24024 -24025 -1026 -24026 0
 24023  24024 -24025 -1026  24027 0
 24023  24024 -24025 -1026 -24028 0

c  2+1 --> break 
c    (-b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧  p_1026) -> break
c  in CNF:
c     b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ -p_1026 ∨ break
c  in DIMACS:
 24023 -24024  24025 -1026 1162 0


c  2-1 --> 1
c    (-b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧ -p_1026) -> (-b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧  b^{342, 4}_0)
c  in CNF:
c     b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_2
c     b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_1
c     b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨  b^{342, 4}_0
c  in DIMACS:
 24023 -24024  24025  1026 -24026 0
 24023 -24024  24025  1026 -24027 0
 24023 -24024  24025  1026  24028 0

c  1-1 --> 0
c    (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0 ∧ -p_1026) -> (-b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧ -b^{342, 4}_0)
c  in CNF:
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_2
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_1
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_0
c  in DIMACS:
 24023  24024 -24025  1026 -24026 0
 24023  24024 -24025  1026 -24027 0
 24023  24024 -24025  1026 -24028 0

c  0-1 --> -1
c    (-b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧ -p_1026) -> ( b^{342, 4}_2 ∧ -b^{342, 4}_1 ∧  b^{342, 4}_0)
c  in CNF:
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨  b^{342, 4}_2
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_1
c     b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨  b^{342, 4}_0
c  in DIMACS:
 24023  24024  24025  1026  24026 0
 24023  24024  24025  1026 -24027 0
 24023  24024  24025  1026  24028 0

c  -1-1 --> -2
c    ( b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧  b^{342, 3}_0 ∧ -p_1026) -> ( b^{342, 4}_2 ∧  b^{342, 4}_1 ∧ -b^{342, 4}_0)
c  in CNF:
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨  b^{342, 4}_2
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨  b^{342, 4}_1
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨  p_1026 ∨ -b^{342, 4}_0
c  in DIMACS:
-24023  24024 -24025  1026  24026 0
-24023  24024 -24025  1026  24027 0
-24023  24024 -24025  1026 -24028 0

c  -2-1 --> break 
c    ( b^{342, 3}_2 ∧  b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧ -p_1026) -> break
c  in CNF:
c    -b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨  b^{342, 3}_0 ∨  p_1026 ∨ break
c  in DIMACS:
-24023 -24024  24025  1026 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{342, 3}_2 ∧ -b^{342, 3}_1 ∧ -b^{342, 3}_0 ∧ true) 
c  in CNF:
c    -b^{342, 3}_2 ∨  b^{342, 3}_1 ∨  b^{342, 3}_0 ∨ false 
c  in DIMACS:
-24023  24024  24025  0

c  3 does not represent an automaton state.
c    -(-b^{342, 3}_2 ∧  b^{342, 3}_1 ∧  b^{342, 3}_0 ∧ true) 
c  in CNF:
c     b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ false 
c  in DIMACS:
 24023 -24024 -24025  0
c  -3 does not represent an automaton state.
c    -( b^{342, 3}_2 ∧  b^{342, 3}_1 ∧  b^{342, 3}_0 ∧ true) 
c  in CNF:
c    -b^{342, 3}_2 ∨ -b^{342, 3}_1 ∨ -b^{342, 3}_0 ∨ false 
c  in DIMACS:
-24023 -24024 -24025  0

c INIT for k = 343
c    -b^{343, 1}_2
c    -b^{343, 1}_1
c    -b^{343, 1}_0
c  in DIMACS:
-24029 0
-24030 0
-24031 0

c Transitions for k = 343
c i = 1
c  -2+1 --> -1
c    ( b^{343, 1}_2 ∧  b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧  p_343) -> ( b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0)
c  in CNF:
c    -b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨  b^{343, 2}_2
c    -b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_1
c    -b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨  b^{343, 2}_0
c  in DIMACS:
-24029 -24030  24031 -343  24032 0
-24029 -24030  24031 -343 -24033 0
-24029 -24030  24031 -343  24034 0

c  -1+1 --> 0
c    ( b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧  b^{343, 1}_0 ∧  p_343) -> (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧ -b^{343, 2}_0)
c  in CNF:
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_2
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_1
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_0
c  in DIMACS:
-24029  24030 -24031 -343 -24032 0
-24029  24030 -24031 -343 -24033 0
-24029  24030 -24031 -343 -24034 0

c  0+1 --> 1
c    (-b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧  p_343) -> (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0)
c  in CNF:
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_2
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_1
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨  b^{343, 2}_0
c  in DIMACS:
 24029  24030  24031 -343 -24032 0
 24029  24030  24031 -343 -24033 0
 24029  24030  24031 -343  24034 0

c  1+1 --> 2
c    (-b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧  b^{343, 1}_0 ∧  p_343) -> (-b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0)
c  in CNF:
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_2
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨  b^{343, 2}_1
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ -p_343 ∨ -b^{343, 2}_0
c  in DIMACS:
 24029  24030 -24031 -343 -24032 0
 24029  24030 -24031 -343  24033 0
 24029  24030 -24031 -343 -24034 0

c  2+1 --> break 
c    (-b^{343, 1}_2 ∧  b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧  p_343) -> break
c  in CNF:
c     b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ -p_343 ∨ break
c  in DIMACS:
 24029 -24030  24031 -343 1162 0


c  2-1 --> 1
c    (-b^{343, 1}_2 ∧  b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧ -p_343) -> (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0)
c  in CNF:
c     b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_2
c     b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_1
c     b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨  b^{343, 2}_0
c  in DIMACS:
 24029 -24030  24031  343 -24032 0
 24029 -24030  24031  343 -24033 0
 24029 -24030  24031  343  24034 0

c  1-1 --> 0
c    (-b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧  b^{343, 1}_0 ∧ -p_343) -> (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧ -b^{343, 2}_0)
c  in CNF:
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_2
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_1
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_0
c  in DIMACS:
 24029  24030 -24031  343 -24032 0
 24029  24030 -24031  343 -24033 0
 24029  24030 -24031  343 -24034 0

c  0-1 --> -1
c    (-b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧ -p_343) -> ( b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0)
c  in CNF:
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨  b^{343, 2}_2
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_1
c     b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨  b^{343, 2}_0
c  in DIMACS:
 24029  24030  24031  343  24032 0
 24029  24030  24031  343 -24033 0
 24029  24030  24031  343  24034 0

c  -1-1 --> -2
c    ( b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧  b^{343, 1}_0 ∧ -p_343) -> ( b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0)
c  in CNF:
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨  b^{343, 2}_2
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨  b^{343, 2}_1
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨  p_343 ∨ -b^{343, 2}_0
c  in DIMACS:
-24029  24030 -24031  343  24032 0
-24029  24030 -24031  343  24033 0
-24029  24030 -24031  343 -24034 0

c  -2-1 --> break 
c    ( b^{343, 1}_2 ∧  b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧ -p_343) -> break
c  in CNF:
c    -b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨  b^{343, 1}_0 ∨  p_343 ∨ break
c  in DIMACS:
-24029 -24030  24031  343 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{343, 1}_2 ∧ -b^{343, 1}_1 ∧ -b^{343, 1}_0 ∧ true) 
c  in CNF:
c    -b^{343, 1}_2 ∨  b^{343, 1}_1 ∨  b^{343, 1}_0 ∨ false 
c  in DIMACS:
-24029  24030  24031  0

c  3 does not represent an automaton state.
c    -(-b^{343, 1}_2 ∧  b^{343, 1}_1 ∧  b^{343, 1}_0 ∧ true) 
c  in CNF:
c     b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ false 
c  in DIMACS:
 24029 -24030 -24031  0
c  -3 does not represent an automaton state.
c    -( b^{343, 1}_2 ∧  b^{343, 1}_1 ∧  b^{343, 1}_0 ∧ true) 
c  in CNF:
c    -b^{343, 1}_2 ∨ -b^{343, 1}_1 ∨ -b^{343, 1}_0 ∨ false 
c  in DIMACS:
-24029 -24030 -24031  0

c i = 2
c  -2+1 --> -1
c    ( b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧  p_686) -> ( b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0)
c  in CNF:
c    -b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨  b^{343, 3}_2
c    -b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_1
c    -b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨  b^{343, 3}_0
c  in DIMACS:
-24032 -24033  24034 -686  24035 0
-24032 -24033  24034 -686 -24036 0
-24032 -24033  24034 -686  24037 0

c  -1+1 --> 0
c    ( b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0 ∧  p_686) -> (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧ -b^{343, 3}_0)
c  in CNF:
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_2
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_1
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_0
c  in DIMACS:
-24032  24033 -24034 -686 -24035 0
-24032  24033 -24034 -686 -24036 0
-24032  24033 -24034 -686 -24037 0

c  0+1 --> 1
c    (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧  p_686) -> (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0)
c  in CNF:
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_2
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_1
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨  b^{343, 3}_0
c  in DIMACS:
 24032  24033  24034 -686 -24035 0
 24032  24033  24034 -686 -24036 0
 24032  24033  24034 -686  24037 0

c  1+1 --> 2
c    (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0 ∧  p_686) -> (-b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0)
c  in CNF:
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_2
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨  b^{343, 3}_1
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ -p_686 ∨ -b^{343, 3}_0
c  in DIMACS:
 24032  24033 -24034 -686 -24035 0
 24032  24033 -24034 -686  24036 0
 24032  24033 -24034 -686 -24037 0

c  2+1 --> break 
c    (-b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧  p_686) -> break
c  in CNF:
c     b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ -p_686 ∨ break
c  in DIMACS:
 24032 -24033  24034 -686 1162 0


c  2-1 --> 1
c    (-b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧ -p_686) -> (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0)
c  in CNF:
c     b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_2
c     b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_1
c     b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨  b^{343, 3}_0
c  in DIMACS:
 24032 -24033  24034  686 -24035 0
 24032 -24033  24034  686 -24036 0
 24032 -24033  24034  686  24037 0

c  1-1 --> 0
c    (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0 ∧ -p_686) -> (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧ -b^{343, 3}_0)
c  in CNF:
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_2
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_1
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_0
c  in DIMACS:
 24032  24033 -24034  686 -24035 0
 24032  24033 -24034  686 -24036 0
 24032  24033 -24034  686 -24037 0

c  0-1 --> -1
c    (-b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧ -p_686) -> ( b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0)
c  in CNF:
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨  b^{343, 3}_2
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_1
c     b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨  b^{343, 3}_0
c  in DIMACS:
 24032  24033  24034  686  24035 0
 24032  24033  24034  686 -24036 0
 24032  24033  24034  686  24037 0

c  -1-1 --> -2
c    ( b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧  b^{343, 2}_0 ∧ -p_686) -> ( b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0)
c  in CNF:
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨  b^{343, 3}_2
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨  b^{343, 3}_1
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨  p_686 ∨ -b^{343, 3}_0
c  in DIMACS:
-24032  24033 -24034  686  24035 0
-24032  24033 -24034  686  24036 0
-24032  24033 -24034  686 -24037 0

c  -2-1 --> break 
c    ( b^{343, 2}_2 ∧  b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧ -p_686) -> break
c  in CNF:
c    -b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨  b^{343, 2}_0 ∨  p_686 ∨ break
c  in DIMACS:
-24032 -24033  24034  686 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{343, 2}_2 ∧ -b^{343, 2}_1 ∧ -b^{343, 2}_0 ∧ true) 
c  in CNF:
c    -b^{343, 2}_2 ∨  b^{343, 2}_1 ∨  b^{343, 2}_0 ∨ false 
c  in DIMACS:
-24032  24033  24034  0

c  3 does not represent an automaton state.
c    -(-b^{343, 2}_2 ∧  b^{343, 2}_1 ∧  b^{343, 2}_0 ∧ true) 
c  in CNF:
c     b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ false 
c  in DIMACS:
 24032 -24033 -24034  0
c  -3 does not represent an automaton state.
c    -( b^{343, 2}_2 ∧  b^{343, 2}_1 ∧  b^{343, 2}_0 ∧ true) 
c  in CNF:
c    -b^{343, 2}_2 ∨ -b^{343, 2}_1 ∨ -b^{343, 2}_0 ∨ false 
c  in DIMACS:
-24032 -24033 -24034  0

c i = 3
c  -2+1 --> -1
c    ( b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧  p_1029) -> ( b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧  b^{343, 4}_0)
c  in CNF:
c    -b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨  b^{343, 4}_2
c    -b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_1
c    -b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨  b^{343, 4}_0
c  in DIMACS:
-24035 -24036  24037 -1029  24038 0
-24035 -24036  24037 -1029 -24039 0
-24035 -24036  24037 -1029  24040 0

c  -1+1 --> 0
c    ( b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0 ∧  p_1029) -> (-b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧ -b^{343, 4}_0)
c  in CNF:
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_2
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_1
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_0
c  in DIMACS:
-24035  24036 -24037 -1029 -24038 0
-24035  24036 -24037 -1029 -24039 0
-24035  24036 -24037 -1029 -24040 0

c  0+1 --> 1
c    (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧  p_1029) -> (-b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧  b^{343, 4}_0)
c  in CNF:
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_2
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_1
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨  b^{343, 4}_0
c  in DIMACS:
 24035  24036  24037 -1029 -24038 0
 24035  24036  24037 -1029 -24039 0
 24035  24036  24037 -1029  24040 0

c  1+1 --> 2
c    (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0 ∧  p_1029) -> (-b^{343, 4}_2 ∧  b^{343, 4}_1 ∧ -b^{343, 4}_0)
c  in CNF:
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_2
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨  b^{343, 4}_1
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ -p_1029 ∨ -b^{343, 4}_0
c  in DIMACS:
 24035  24036 -24037 -1029 -24038 0
 24035  24036 -24037 -1029  24039 0
 24035  24036 -24037 -1029 -24040 0

c  2+1 --> break 
c    (-b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧  p_1029) -> break
c  in CNF:
c     b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ -p_1029 ∨ break
c  in DIMACS:
 24035 -24036  24037 -1029 1162 0


c  2-1 --> 1
c    (-b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧ -p_1029) -> (-b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧  b^{343, 4}_0)
c  in CNF:
c     b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_2
c     b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_1
c     b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨  b^{343, 4}_0
c  in DIMACS:
 24035 -24036  24037  1029 -24038 0
 24035 -24036  24037  1029 -24039 0
 24035 -24036  24037  1029  24040 0

c  1-1 --> 0
c    (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0 ∧ -p_1029) -> (-b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧ -b^{343, 4}_0)
c  in CNF:
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_2
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_1
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_0
c  in DIMACS:
 24035  24036 -24037  1029 -24038 0
 24035  24036 -24037  1029 -24039 0
 24035  24036 -24037  1029 -24040 0

c  0-1 --> -1
c    (-b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧ -p_1029) -> ( b^{343, 4}_2 ∧ -b^{343, 4}_1 ∧  b^{343, 4}_0)
c  in CNF:
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨  b^{343, 4}_2
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_1
c     b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨  b^{343, 4}_0
c  in DIMACS:
 24035  24036  24037  1029  24038 0
 24035  24036  24037  1029 -24039 0
 24035  24036  24037  1029  24040 0

c  -1-1 --> -2
c    ( b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧  b^{343, 3}_0 ∧ -p_1029) -> ( b^{343, 4}_2 ∧  b^{343, 4}_1 ∧ -b^{343, 4}_0)
c  in CNF:
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨  b^{343, 4}_2
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨  b^{343, 4}_1
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨  p_1029 ∨ -b^{343, 4}_0
c  in DIMACS:
-24035  24036 -24037  1029  24038 0
-24035  24036 -24037  1029  24039 0
-24035  24036 -24037  1029 -24040 0

c  -2-1 --> break 
c    ( b^{343, 3}_2 ∧  b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧ -p_1029) -> break
c  in CNF:
c    -b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨  b^{343, 3}_0 ∨  p_1029 ∨ break
c  in DIMACS:
-24035 -24036  24037  1029 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{343, 3}_2 ∧ -b^{343, 3}_1 ∧ -b^{343, 3}_0 ∧ true) 
c  in CNF:
c    -b^{343, 3}_2 ∨  b^{343, 3}_1 ∨  b^{343, 3}_0 ∨ false 
c  in DIMACS:
-24035  24036  24037  0

c  3 does not represent an automaton state.
c    -(-b^{343, 3}_2 ∧  b^{343, 3}_1 ∧  b^{343, 3}_0 ∧ true) 
c  in CNF:
c     b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ false 
c  in DIMACS:
 24035 -24036 -24037  0
c  -3 does not represent an automaton state.
c    -( b^{343, 3}_2 ∧  b^{343, 3}_1 ∧  b^{343, 3}_0 ∧ true) 
c  in CNF:
c    -b^{343, 3}_2 ∨ -b^{343, 3}_1 ∨ -b^{343, 3}_0 ∨ false 
c  in DIMACS:
-24035 -24036 -24037  0

c INIT for k = 344
c    -b^{344, 1}_2
c    -b^{344, 1}_1
c    -b^{344, 1}_0
c  in DIMACS:
-24041 0
-24042 0
-24043 0

c Transitions for k = 344
c i = 1
c  -2+1 --> -1
c    ( b^{344, 1}_2 ∧  b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧  p_344) -> ( b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0)
c  in CNF:
c    -b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨  b^{344, 2}_2
c    -b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_1
c    -b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨  b^{344, 2}_0
c  in DIMACS:
-24041 -24042  24043 -344  24044 0
-24041 -24042  24043 -344 -24045 0
-24041 -24042  24043 -344  24046 0

c  -1+1 --> 0
c    ( b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧  b^{344, 1}_0 ∧  p_344) -> (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧ -b^{344, 2}_0)
c  in CNF:
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_2
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_1
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_0
c  in DIMACS:
-24041  24042 -24043 -344 -24044 0
-24041  24042 -24043 -344 -24045 0
-24041  24042 -24043 -344 -24046 0

c  0+1 --> 1
c    (-b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧  p_344) -> (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0)
c  in CNF:
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_2
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_1
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨  b^{344, 2}_0
c  in DIMACS:
 24041  24042  24043 -344 -24044 0
 24041  24042  24043 -344 -24045 0
 24041  24042  24043 -344  24046 0

c  1+1 --> 2
c    (-b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧  b^{344, 1}_0 ∧  p_344) -> (-b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0)
c  in CNF:
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_2
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨  b^{344, 2}_1
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ -p_344 ∨ -b^{344, 2}_0
c  in DIMACS:
 24041  24042 -24043 -344 -24044 0
 24041  24042 -24043 -344  24045 0
 24041  24042 -24043 -344 -24046 0

c  2+1 --> break 
c    (-b^{344, 1}_2 ∧  b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧  p_344) -> break
c  in CNF:
c     b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ -p_344 ∨ break
c  in DIMACS:
 24041 -24042  24043 -344 1162 0


c  2-1 --> 1
c    (-b^{344, 1}_2 ∧  b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧ -p_344) -> (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0)
c  in CNF:
c     b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_2
c     b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_1
c     b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨  b^{344, 2}_0
c  in DIMACS:
 24041 -24042  24043  344 -24044 0
 24041 -24042  24043  344 -24045 0
 24041 -24042  24043  344  24046 0

c  1-1 --> 0
c    (-b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧  b^{344, 1}_0 ∧ -p_344) -> (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧ -b^{344, 2}_0)
c  in CNF:
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_2
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_1
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_0
c  in DIMACS:
 24041  24042 -24043  344 -24044 0
 24041  24042 -24043  344 -24045 0
 24041  24042 -24043  344 -24046 0

c  0-1 --> -1
c    (-b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧ -p_344) -> ( b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0)
c  in CNF:
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨  b^{344, 2}_2
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_1
c     b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨  b^{344, 2}_0
c  in DIMACS:
 24041  24042  24043  344  24044 0
 24041  24042  24043  344 -24045 0
 24041  24042  24043  344  24046 0

c  -1-1 --> -2
c    ( b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧  b^{344, 1}_0 ∧ -p_344) -> ( b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0)
c  in CNF:
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨  b^{344, 2}_2
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨  b^{344, 2}_1
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨  p_344 ∨ -b^{344, 2}_0
c  in DIMACS:
-24041  24042 -24043  344  24044 0
-24041  24042 -24043  344  24045 0
-24041  24042 -24043  344 -24046 0

c  -2-1 --> break 
c    ( b^{344, 1}_2 ∧  b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧ -p_344) -> break
c  in CNF:
c    -b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨  b^{344, 1}_0 ∨  p_344 ∨ break
c  in DIMACS:
-24041 -24042  24043  344 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{344, 1}_2 ∧ -b^{344, 1}_1 ∧ -b^{344, 1}_0 ∧ true) 
c  in CNF:
c    -b^{344, 1}_2 ∨  b^{344, 1}_1 ∨  b^{344, 1}_0 ∨ false 
c  in DIMACS:
-24041  24042  24043  0

c  3 does not represent an automaton state.
c    -(-b^{344, 1}_2 ∧  b^{344, 1}_1 ∧  b^{344, 1}_0 ∧ true) 
c  in CNF:
c     b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ false 
c  in DIMACS:
 24041 -24042 -24043  0
c  -3 does not represent an automaton state.
c    -( b^{344, 1}_2 ∧  b^{344, 1}_1 ∧  b^{344, 1}_0 ∧ true) 
c  in CNF:
c    -b^{344, 1}_2 ∨ -b^{344, 1}_1 ∨ -b^{344, 1}_0 ∨ false 
c  in DIMACS:
-24041 -24042 -24043  0

c i = 2
c  -2+1 --> -1
c    ( b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧  p_688) -> ( b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0)
c  in CNF:
c    -b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨  b^{344, 3}_2
c    -b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_1
c    -b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨  b^{344, 3}_0
c  in DIMACS:
-24044 -24045  24046 -688  24047 0
-24044 -24045  24046 -688 -24048 0
-24044 -24045  24046 -688  24049 0

c  -1+1 --> 0
c    ( b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0 ∧  p_688) -> (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧ -b^{344, 3}_0)
c  in CNF:
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_2
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_1
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_0
c  in DIMACS:
-24044  24045 -24046 -688 -24047 0
-24044  24045 -24046 -688 -24048 0
-24044  24045 -24046 -688 -24049 0

c  0+1 --> 1
c    (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧  p_688) -> (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0)
c  in CNF:
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_2
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_1
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨  b^{344, 3}_0
c  in DIMACS:
 24044  24045  24046 -688 -24047 0
 24044  24045  24046 -688 -24048 0
 24044  24045  24046 -688  24049 0

c  1+1 --> 2
c    (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0 ∧  p_688) -> (-b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0)
c  in CNF:
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_2
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨  b^{344, 3}_1
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ -p_688 ∨ -b^{344, 3}_0
c  in DIMACS:
 24044  24045 -24046 -688 -24047 0
 24044  24045 -24046 -688  24048 0
 24044  24045 -24046 -688 -24049 0

c  2+1 --> break 
c    (-b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧  p_688) -> break
c  in CNF:
c     b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ -p_688 ∨ break
c  in DIMACS:
 24044 -24045  24046 -688 1162 0


c  2-1 --> 1
c    (-b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧ -p_688) -> (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0)
c  in CNF:
c     b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_2
c     b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_1
c     b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨  b^{344, 3}_0
c  in DIMACS:
 24044 -24045  24046  688 -24047 0
 24044 -24045  24046  688 -24048 0
 24044 -24045  24046  688  24049 0

c  1-1 --> 0
c    (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0 ∧ -p_688) -> (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧ -b^{344, 3}_0)
c  in CNF:
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_2
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_1
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_0
c  in DIMACS:
 24044  24045 -24046  688 -24047 0
 24044  24045 -24046  688 -24048 0
 24044  24045 -24046  688 -24049 0

c  0-1 --> -1
c    (-b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧ -p_688) -> ( b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0)
c  in CNF:
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨  b^{344, 3}_2
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_1
c     b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨  b^{344, 3}_0
c  in DIMACS:
 24044  24045  24046  688  24047 0
 24044  24045  24046  688 -24048 0
 24044  24045  24046  688  24049 0

c  -1-1 --> -2
c    ( b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧  b^{344, 2}_0 ∧ -p_688) -> ( b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0)
c  in CNF:
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨  b^{344, 3}_2
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨  b^{344, 3}_1
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨  p_688 ∨ -b^{344, 3}_0
c  in DIMACS:
-24044  24045 -24046  688  24047 0
-24044  24045 -24046  688  24048 0
-24044  24045 -24046  688 -24049 0

c  -2-1 --> break 
c    ( b^{344, 2}_2 ∧  b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧ -p_688) -> break
c  in CNF:
c    -b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨  b^{344, 2}_0 ∨  p_688 ∨ break
c  in DIMACS:
-24044 -24045  24046  688 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{344, 2}_2 ∧ -b^{344, 2}_1 ∧ -b^{344, 2}_0 ∧ true) 
c  in CNF:
c    -b^{344, 2}_2 ∨  b^{344, 2}_1 ∨  b^{344, 2}_0 ∨ false 
c  in DIMACS:
-24044  24045  24046  0

c  3 does not represent an automaton state.
c    -(-b^{344, 2}_2 ∧  b^{344, 2}_1 ∧  b^{344, 2}_0 ∧ true) 
c  in CNF:
c     b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ false 
c  in DIMACS:
 24044 -24045 -24046  0
c  -3 does not represent an automaton state.
c    -( b^{344, 2}_2 ∧  b^{344, 2}_1 ∧  b^{344, 2}_0 ∧ true) 
c  in CNF:
c    -b^{344, 2}_2 ∨ -b^{344, 2}_1 ∨ -b^{344, 2}_0 ∨ false 
c  in DIMACS:
-24044 -24045 -24046  0

c i = 3
c  -2+1 --> -1
c    ( b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧  p_1032) -> ( b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧  b^{344, 4}_0)
c  in CNF:
c    -b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨  b^{344, 4}_2
c    -b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_1
c    -b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨  b^{344, 4}_0
c  in DIMACS:
-24047 -24048  24049 -1032  24050 0
-24047 -24048  24049 -1032 -24051 0
-24047 -24048  24049 -1032  24052 0

c  -1+1 --> 0
c    ( b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0 ∧  p_1032) -> (-b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧ -b^{344, 4}_0)
c  in CNF:
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_2
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_1
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_0
c  in DIMACS:
-24047  24048 -24049 -1032 -24050 0
-24047  24048 -24049 -1032 -24051 0
-24047  24048 -24049 -1032 -24052 0

c  0+1 --> 1
c    (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧  p_1032) -> (-b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧  b^{344, 4}_0)
c  in CNF:
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_2
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_1
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨  b^{344, 4}_0
c  in DIMACS:
 24047  24048  24049 -1032 -24050 0
 24047  24048  24049 -1032 -24051 0
 24047  24048  24049 -1032  24052 0

c  1+1 --> 2
c    (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0 ∧  p_1032) -> (-b^{344, 4}_2 ∧  b^{344, 4}_1 ∧ -b^{344, 4}_0)
c  in CNF:
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_2
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨  b^{344, 4}_1
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ -p_1032 ∨ -b^{344, 4}_0
c  in DIMACS:
 24047  24048 -24049 -1032 -24050 0
 24047  24048 -24049 -1032  24051 0
 24047  24048 -24049 -1032 -24052 0

c  2+1 --> break 
c    (-b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧  p_1032) -> break
c  in CNF:
c     b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ -p_1032 ∨ break
c  in DIMACS:
 24047 -24048  24049 -1032 1162 0


c  2-1 --> 1
c    (-b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧ -p_1032) -> (-b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧  b^{344, 4}_0)
c  in CNF:
c     b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_2
c     b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_1
c     b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨  b^{344, 4}_0
c  in DIMACS:
 24047 -24048  24049  1032 -24050 0
 24047 -24048  24049  1032 -24051 0
 24047 -24048  24049  1032  24052 0

c  1-1 --> 0
c    (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0 ∧ -p_1032) -> (-b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧ -b^{344, 4}_0)
c  in CNF:
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_2
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_1
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_0
c  in DIMACS:
 24047  24048 -24049  1032 -24050 0
 24047  24048 -24049  1032 -24051 0
 24047  24048 -24049  1032 -24052 0

c  0-1 --> -1
c    (-b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧ -p_1032) -> ( b^{344, 4}_2 ∧ -b^{344, 4}_1 ∧  b^{344, 4}_0)
c  in CNF:
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨  b^{344, 4}_2
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_1
c     b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨  b^{344, 4}_0
c  in DIMACS:
 24047  24048  24049  1032  24050 0
 24047  24048  24049  1032 -24051 0
 24047  24048  24049  1032  24052 0

c  -1-1 --> -2
c    ( b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧  b^{344, 3}_0 ∧ -p_1032) -> ( b^{344, 4}_2 ∧  b^{344, 4}_1 ∧ -b^{344, 4}_0)
c  in CNF:
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨  b^{344, 4}_2
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨  b^{344, 4}_1
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨  p_1032 ∨ -b^{344, 4}_0
c  in DIMACS:
-24047  24048 -24049  1032  24050 0
-24047  24048 -24049  1032  24051 0
-24047  24048 -24049  1032 -24052 0

c  -2-1 --> break 
c    ( b^{344, 3}_2 ∧  b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧ -p_1032) -> break
c  in CNF:
c    -b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨  b^{344, 3}_0 ∨  p_1032 ∨ break
c  in DIMACS:
-24047 -24048  24049  1032 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{344, 3}_2 ∧ -b^{344, 3}_1 ∧ -b^{344, 3}_0 ∧ true) 
c  in CNF:
c    -b^{344, 3}_2 ∨  b^{344, 3}_1 ∨  b^{344, 3}_0 ∨ false 
c  in DIMACS:
-24047  24048  24049  0

c  3 does not represent an automaton state.
c    -(-b^{344, 3}_2 ∧  b^{344, 3}_1 ∧  b^{344, 3}_0 ∧ true) 
c  in CNF:
c     b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ false 
c  in DIMACS:
 24047 -24048 -24049  0
c  -3 does not represent an automaton state.
c    -( b^{344, 3}_2 ∧  b^{344, 3}_1 ∧  b^{344, 3}_0 ∧ true) 
c  in CNF:
c    -b^{344, 3}_2 ∨ -b^{344, 3}_1 ∨ -b^{344, 3}_0 ∨ false 
c  in DIMACS:
-24047 -24048 -24049  0

c INIT for k = 345
c    -b^{345, 1}_2
c    -b^{345, 1}_1
c    -b^{345, 1}_0
c  in DIMACS:
-24053 0
-24054 0
-24055 0

c Transitions for k = 345
c i = 1
c  -2+1 --> -1
c    ( b^{345, 1}_2 ∧  b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧  p_345) -> ( b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0)
c  in CNF:
c    -b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨  b^{345, 2}_2
c    -b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_1
c    -b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨  b^{345, 2}_0
c  in DIMACS:
-24053 -24054  24055 -345  24056 0
-24053 -24054  24055 -345 -24057 0
-24053 -24054  24055 -345  24058 0

c  -1+1 --> 0
c    ( b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧  b^{345, 1}_0 ∧  p_345) -> (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧ -b^{345, 2}_0)
c  in CNF:
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_2
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_1
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_0
c  in DIMACS:
-24053  24054 -24055 -345 -24056 0
-24053  24054 -24055 -345 -24057 0
-24053  24054 -24055 -345 -24058 0

c  0+1 --> 1
c    (-b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧  p_345) -> (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0)
c  in CNF:
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_2
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_1
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨  b^{345, 2}_0
c  in DIMACS:
 24053  24054  24055 -345 -24056 0
 24053  24054  24055 -345 -24057 0
 24053  24054  24055 -345  24058 0

c  1+1 --> 2
c    (-b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧  b^{345, 1}_0 ∧  p_345) -> (-b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0)
c  in CNF:
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_2
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨  b^{345, 2}_1
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ -p_345 ∨ -b^{345, 2}_0
c  in DIMACS:
 24053  24054 -24055 -345 -24056 0
 24053  24054 -24055 -345  24057 0
 24053  24054 -24055 -345 -24058 0

c  2+1 --> break 
c    (-b^{345, 1}_2 ∧  b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧  p_345) -> break
c  in CNF:
c     b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ -p_345 ∨ break
c  in DIMACS:
 24053 -24054  24055 -345 1162 0


c  2-1 --> 1
c    (-b^{345, 1}_2 ∧  b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧ -p_345) -> (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0)
c  in CNF:
c     b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_2
c     b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_1
c     b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨  b^{345, 2}_0
c  in DIMACS:
 24053 -24054  24055  345 -24056 0
 24053 -24054  24055  345 -24057 0
 24053 -24054  24055  345  24058 0

c  1-1 --> 0
c    (-b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧  b^{345, 1}_0 ∧ -p_345) -> (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧ -b^{345, 2}_0)
c  in CNF:
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_2
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_1
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_0
c  in DIMACS:
 24053  24054 -24055  345 -24056 0
 24053  24054 -24055  345 -24057 0
 24053  24054 -24055  345 -24058 0

c  0-1 --> -1
c    (-b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧ -p_345) -> ( b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0)
c  in CNF:
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨  b^{345, 2}_2
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_1
c     b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨  b^{345, 2}_0
c  in DIMACS:
 24053  24054  24055  345  24056 0
 24053  24054  24055  345 -24057 0
 24053  24054  24055  345  24058 0

c  -1-1 --> -2
c    ( b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧  b^{345, 1}_0 ∧ -p_345) -> ( b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0)
c  in CNF:
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨  b^{345, 2}_2
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨  b^{345, 2}_1
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨  p_345 ∨ -b^{345, 2}_0
c  in DIMACS:
-24053  24054 -24055  345  24056 0
-24053  24054 -24055  345  24057 0
-24053  24054 -24055  345 -24058 0

c  -2-1 --> break 
c    ( b^{345, 1}_2 ∧  b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧ -p_345) -> break
c  in CNF:
c    -b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨  b^{345, 1}_0 ∨  p_345 ∨ break
c  in DIMACS:
-24053 -24054  24055  345 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{345, 1}_2 ∧ -b^{345, 1}_1 ∧ -b^{345, 1}_0 ∧ true) 
c  in CNF:
c    -b^{345, 1}_2 ∨  b^{345, 1}_1 ∨  b^{345, 1}_0 ∨ false 
c  in DIMACS:
-24053  24054  24055  0

c  3 does not represent an automaton state.
c    -(-b^{345, 1}_2 ∧  b^{345, 1}_1 ∧  b^{345, 1}_0 ∧ true) 
c  in CNF:
c     b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ false 
c  in DIMACS:
 24053 -24054 -24055  0
c  -3 does not represent an automaton state.
c    -( b^{345, 1}_2 ∧  b^{345, 1}_1 ∧  b^{345, 1}_0 ∧ true) 
c  in CNF:
c    -b^{345, 1}_2 ∨ -b^{345, 1}_1 ∨ -b^{345, 1}_0 ∨ false 
c  in DIMACS:
-24053 -24054 -24055  0

c i = 2
c  -2+1 --> -1
c    ( b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧  p_690) -> ( b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0)
c  in CNF:
c    -b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨  b^{345, 3}_2
c    -b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_1
c    -b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨  b^{345, 3}_0
c  in DIMACS:
-24056 -24057  24058 -690  24059 0
-24056 -24057  24058 -690 -24060 0
-24056 -24057  24058 -690  24061 0

c  -1+1 --> 0
c    ( b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0 ∧  p_690) -> (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧ -b^{345, 3}_0)
c  in CNF:
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_2
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_1
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_0
c  in DIMACS:
-24056  24057 -24058 -690 -24059 0
-24056  24057 -24058 -690 -24060 0
-24056  24057 -24058 -690 -24061 0

c  0+1 --> 1
c    (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧  p_690) -> (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0)
c  in CNF:
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_2
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_1
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨  b^{345, 3}_0
c  in DIMACS:
 24056  24057  24058 -690 -24059 0
 24056  24057  24058 -690 -24060 0
 24056  24057  24058 -690  24061 0

c  1+1 --> 2
c    (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0 ∧  p_690) -> (-b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0)
c  in CNF:
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_2
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨  b^{345, 3}_1
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ -p_690 ∨ -b^{345, 3}_0
c  in DIMACS:
 24056  24057 -24058 -690 -24059 0
 24056  24057 -24058 -690  24060 0
 24056  24057 -24058 -690 -24061 0

c  2+1 --> break 
c    (-b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧  p_690) -> break
c  in CNF:
c     b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ -p_690 ∨ break
c  in DIMACS:
 24056 -24057  24058 -690 1162 0


c  2-1 --> 1
c    (-b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧ -p_690) -> (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0)
c  in CNF:
c     b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_2
c     b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_1
c     b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨  b^{345, 3}_0
c  in DIMACS:
 24056 -24057  24058  690 -24059 0
 24056 -24057  24058  690 -24060 0
 24056 -24057  24058  690  24061 0

c  1-1 --> 0
c    (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0 ∧ -p_690) -> (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧ -b^{345, 3}_0)
c  in CNF:
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_2
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_1
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_0
c  in DIMACS:
 24056  24057 -24058  690 -24059 0
 24056  24057 -24058  690 -24060 0
 24056  24057 -24058  690 -24061 0

c  0-1 --> -1
c    (-b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧ -p_690) -> ( b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0)
c  in CNF:
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨  b^{345, 3}_2
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_1
c     b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨  b^{345, 3}_0
c  in DIMACS:
 24056  24057  24058  690  24059 0
 24056  24057  24058  690 -24060 0
 24056  24057  24058  690  24061 0

c  -1-1 --> -2
c    ( b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧  b^{345, 2}_0 ∧ -p_690) -> ( b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0)
c  in CNF:
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨  b^{345, 3}_2
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨  b^{345, 3}_1
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨  p_690 ∨ -b^{345, 3}_0
c  in DIMACS:
-24056  24057 -24058  690  24059 0
-24056  24057 -24058  690  24060 0
-24056  24057 -24058  690 -24061 0

c  -2-1 --> break 
c    ( b^{345, 2}_2 ∧  b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧ -p_690) -> break
c  in CNF:
c    -b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨  b^{345, 2}_0 ∨  p_690 ∨ break
c  in DIMACS:
-24056 -24057  24058  690 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{345, 2}_2 ∧ -b^{345, 2}_1 ∧ -b^{345, 2}_0 ∧ true) 
c  in CNF:
c    -b^{345, 2}_2 ∨  b^{345, 2}_1 ∨  b^{345, 2}_0 ∨ false 
c  in DIMACS:
-24056  24057  24058  0

c  3 does not represent an automaton state.
c    -(-b^{345, 2}_2 ∧  b^{345, 2}_1 ∧  b^{345, 2}_0 ∧ true) 
c  in CNF:
c     b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ false 
c  in DIMACS:
 24056 -24057 -24058  0
c  -3 does not represent an automaton state.
c    -( b^{345, 2}_2 ∧  b^{345, 2}_1 ∧  b^{345, 2}_0 ∧ true) 
c  in CNF:
c    -b^{345, 2}_2 ∨ -b^{345, 2}_1 ∨ -b^{345, 2}_0 ∨ false 
c  in DIMACS:
-24056 -24057 -24058  0

c i = 3
c  -2+1 --> -1
c    ( b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧  p_1035) -> ( b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧  b^{345, 4}_0)
c  in CNF:
c    -b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨  b^{345, 4}_2
c    -b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_1
c    -b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨  b^{345, 4}_0
c  in DIMACS:
-24059 -24060  24061 -1035  24062 0
-24059 -24060  24061 -1035 -24063 0
-24059 -24060  24061 -1035  24064 0

c  -1+1 --> 0
c    ( b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0 ∧  p_1035) -> (-b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧ -b^{345, 4}_0)
c  in CNF:
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_2
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_1
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_0
c  in DIMACS:
-24059  24060 -24061 -1035 -24062 0
-24059  24060 -24061 -1035 -24063 0
-24059  24060 -24061 -1035 -24064 0

c  0+1 --> 1
c    (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧  p_1035) -> (-b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧  b^{345, 4}_0)
c  in CNF:
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_2
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_1
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨  b^{345, 4}_0
c  in DIMACS:
 24059  24060  24061 -1035 -24062 0
 24059  24060  24061 -1035 -24063 0
 24059  24060  24061 -1035  24064 0

c  1+1 --> 2
c    (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0 ∧  p_1035) -> (-b^{345, 4}_2 ∧  b^{345, 4}_1 ∧ -b^{345, 4}_0)
c  in CNF:
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_2
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨  b^{345, 4}_1
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ -p_1035 ∨ -b^{345, 4}_0
c  in DIMACS:
 24059  24060 -24061 -1035 -24062 0
 24059  24060 -24061 -1035  24063 0
 24059  24060 -24061 -1035 -24064 0

c  2+1 --> break 
c    (-b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧  p_1035) -> break
c  in CNF:
c     b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ -p_1035 ∨ break
c  in DIMACS:
 24059 -24060  24061 -1035 1162 0


c  2-1 --> 1
c    (-b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧ -p_1035) -> (-b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧  b^{345, 4}_0)
c  in CNF:
c     b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_2
c     b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_1
c     b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨  b^{345, 4}_0
c  in DIMACS:
 24059 -24060  24061  1035 -24062 0
 24059 -24060  24061  1035 -24063 0
 24059 -24060  24061  1035  24064 0

c  1-1 --> 0
c    (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0 ∧ -p_1035) -> (-b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧ -b^{345, 4}_0)
c  in CNF:
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_2
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_1
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_0
c  in DIMACS:
 24059  24060 -24061  1035 -24062 0
 24059  24060 -24061  1035 -24063 0
 24059  24060 -24061  1035 -24064 0

c  0-1 --> -1
c    (-b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧ -p_1035) -> ( b^{345, 4}_2 ∧ -b^{345, 4}_1 ∧  b^{345, 4}_0)
c  in CNF:
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨  b^{345, 4}_2
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_1
c     b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨  b^{345, 4}_0
c  in DIMACS:
 24059  24060  24061  1035  24062 0
 24059  24060  24061  1035 -24063 0
 24059  24060  24061  1035  24064 0

c  -1-1 --> -2
c    ( b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧  b^{345, 3}_0 ∧ -p_1035) -> ( b^{345, 4}_2 ∧  b^{345, 4}_1 ∧ -b^{345, 4}_0)
c  in CNF:
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨  b^{345, 4}_2
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨  b^{345, 4}_1
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨  p_1035 ∨ -b^{345, 4}_0
c  in DIMACS:
-24059  24060 -24061  1035  24062 0
-24059  24060 -24061  1035  24063 0
-24059  24060 -24061  1035 -24064 0

c  -2-1 --> break 
c    ( b^{345, 3}_2 ∧  b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧ -p_1035) -> break
c  in CNF:
c    -b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨  b^{345, 3}_0 ∨  p_1035 ∨ break
c  in DIMACS:
-24059 -24060  24061  1035 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{345, 3}_2 ∧ -b^{345, 3}_1 ∧ -b^{345, 3}_0 ∧ true) 
c  in CNF:
c    -b^{345, 3}_2 ∨  b^{345, 3}_1 ∨  b^{345, 3}_0 ∨ false 
c  in DIMACS:
-24059  24060  24061  0

c  3 does not represent an automaton state.
c    -(-b^{345, 3}_2 ∧  b^{345, 3}_1 ∧  b^{345, 3}_0 ∧ true) 
c  in CNF:
c     b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ false 
c  in DIMACS:
 24059 -24060 -24061  0
c  -3 does not represent an automaton state.
c    -( b^{345, 3}_2 ∧  b^{345, 3}_1 ∧  b^{345, 3}_0 ∧ true) 
c  in CNF:
c    -b^{345, 3}_2 ∨ -b^{345, 3}_1 ∨ -b^{345, 3}_0 ∨ false 
c  in DIMACS:
-24059 -24060 -24061  0

c INIT for k = 346
c    -b^{346, 1}_2
c    -b^{346, 1}_1
c    -b^{346, 1}_0
c  in DIMACS:
-24065 0
-24066 0
-24067 0

c Transitions for k = 346
c i = 1
c  -2+1 --> -1
c    ( b^{346, 1}_2 ∧  b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧  p_346) -> ( b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0)
c  in CNF:
c    -b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨  b^{346, 2}_2
c    -b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_1
c    -b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨  b^{346, 2}_0
c  in DIMACS:
-24065 -24066  24067 -346  24068 0
-24065 -24066  24067 -346 -24069 0
-24065 -24066  24067 -346  24070 0

c  -1+1 --> 0
c    ( b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧  b^{346, 1}_0 ∧  p_346) -> (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧ -b^{346, 2}_0)
c  in CNF:
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_2
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_1
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_0
c  in DIMACS:
-24065  24066 -24067 -346 -24068 0
-24065  24066 -24067 -346 -24069 0
-24065  24066 -24067 -346 -24070 0

c  0+1 --> 1
c    (-b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧  p_346) -> (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0)
c  in CNF:
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_2
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_1
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨  b^{346, 2}_0
c  in DIMACS:
 24065  24066  24067 -346 -24068 0
 24065  24066  24067 -346 -24069 0
 24065  24066  24067 -346  24070 0

c  1+1 --> 2
c    (-b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧  b^{346, 1}_0 ∧  p_346) -> (-b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0)
c  in CNF:
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_2
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨  b^{346, 2}_1
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ -p_346 ∨ -b^{346, 2}_0
c  in DIMACS:
 24065  24066 -24067 -346 -24068 0
 24065  24066 -24067 -346  24069 0
 24065  24066 -24067 -346 -24070 0

c  2+1 --> break 
c    (-b^{346, 1}_2 ∧  b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧  p_346) -> break
c  in CNF:
c     b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ -p_346 ∨ break
c  in DIMACS:
 24065 -24066  24067 -346 1162 0


c  2-1 --> 1
c    (-b^{346, 1}_2 ∧  b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧ -p_346) -> (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0)
c  in CNF:
c     b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_2
c     b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_1
c     b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨  b^{346, 2}_0
c  in DIMACS:
 24065 -24066  24067  346 -24068 0
 24065 -24066  24067  346 -24069 0
 24065 -24066  24067  346  24070 0

c  1-1 --> 0
c    (-b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧  b^{346, 1}_0 ∧ -p_346) -> (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧ -b^{346, 2}_0)
c  in CNF:
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_2
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_1
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_0
c  in DIMACS:
 24065  24066 -24067  346 -24068 0
 24065  24066 -24067  346 -24069 0
 24065  24066 -24067  346 -24070 0

c  0-1 --> -1
c    (-b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧ -p_346) -> ( b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0)
c  in CNF:
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨  b^{346, 2}_2
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_1
c     b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨  b^{346, 2}_0
c  in DIMACS:
 24065  24066  24067  346  24068 0
 24065  24066  24067  346 -24069 0
 24065  24066  24067  346  24070 0

c  -1-1 --> -2
c    ( b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧  b^{346, 1}_0 ∧ -p_346) -> ( b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0)
c  in CNF:
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨  b^{346, 2}_2
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨  b^{346, 2}_1
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨  p_346 ∨ -b^{346, 2}_0
c  in DIMACS:
-24065  24066 -24067  346  24068 0
-24065  24066 -24067  346  24069 0
-24065  24066 -24067  346 -24070 0

c  -2-1 --> break 
c    ( b^{346, 1}_2 ∧  b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧ -p_346) -> break
c  in CNF:
c    -b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨  b^{346, 1}_0 ∨  p_346 ∨ break
c  in DIMACS:
-24065 -24066  24067  346 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{346, 1}_2 ∧ -b^{346, 1}_1 ∧ -b^{346, 1}_0 ∧ true) 
c  in CNF:
c    -b^{346, 1}_2 ∨  b^{346, 1}_1 ∨  b^{346, 1}_0 ∨ false 
c  in DIMACS:
-24065  24066  24067  0

c  3 does not represent an automaton state.
c    -(-b^{346, 1}_2 ∧  b^{346, 1}_1 ∧  b^{346, 1}_0 ∧ true) 
c  in CNF:
c     b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ false 
c  in DIMACS:
 24065 -24066 -24067  0
c  -3 does not represent an automaton state.
c    -( b^{346, 1}_2 ∧  b^{346, 1}_1 ∧  b^{346, 1}_0 ∧ true) 
c  in CNF:
c    -b^{346, 1}_2 ∨ -b^{346, 1}_1 ∨ -b^{346, 1}_0 ∨ false 
c  in DIMACS:
-24065 -24066 -24067  0

c i = 2
c  -2+1 --> -1
c    ( b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧  p_692) -> ( b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0)
c  in CNF:
c    -b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨  b^{346, 3}_2
c    -b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_1
c    -b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨  b^{346, 3}_0
c  in DIMACS:
-24068 -24069  24070 -692  24071 0
-24068 -24069  24070 -692 -24072 0
-24068 -24069  24070 -692  24073 0

c  -1+1 --> 0
c    ( b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0 ∧  p_692) -> (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧ -b^{346, 3}_0)
c  in CNF:
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_2
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_1
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_0
c  in DIMACS:
-24068  24069 -24070 -692 -24071 0
-24068  24069 -24070 -692 -24072 0
-24068  24069 -24070 -692 -24073 0

c  0+1 --> 1
c    (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧  p_692) -> (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0)
c  in CNF:
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_2
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_1
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨  b^{346, 3}_0
c  in DIMACS:
 24068  24069  24070 -692 -24071 0
 24068  24069  24070 -692 -24072 0
 24068  24069  24070 -692  24073 0

c  1+1 --> 2
c    (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0 ∧  p_692) -> (-b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0)
c  in CNF:
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_2
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨  b^{346, 3}_1
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ -p_692 ∨ -b^{346, 3}_0
c  in DIMACS:
 24068  24069 -24070 -692 -24071 0
 24068  24069 -24070 -692  24072 0
 24068  24069 -24070 -692 -24073 0

c  2+1 --> break 
c    (-b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧  p_692) -> break
c  in CNF:
c     b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ -p_692 ∨ break
c  in DIMACS:
 24068 -24069  24070 -692 1162 0


c  2-1 --> 1
c    (-b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧ -p_692) -> (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0)
c  in CNF:
c     b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_2
c     b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_1
c     b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨  b^{346, 3}_0
c  in DIMACS:
 24068 -24069  24070  692 -24071 0
 24068 -24069  24070  692 -24072 0
 24068 -24069  24070  692  24073 0

c  1-1 --> 0
c    (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0 ∧ -p_692) -> (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧ -b^{346, 3}_0)
c  in CNF:
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_2
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_1
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_0
c  in DIMACS:
 24068  24069 -24070  692 -24071 0
 24068  24069 -24070  692 -24072 0
 24068  24069 -24070  692 -24073 0

c  0-1 --> -1
c    (-b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧ -p_692) -> ( b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0)
c  in CNF:
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨  b^{346, 3}_2
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_1
c     b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨  b^{346, 3}_0
c  in DIMACS:
 24068  24069  24070  692  24071 0
 24068  24069  24070  692 -24072 0
 24068  24069  24070  692  24073 0

c  -1-1 --> -2
c    ( b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧  b^{346, 2}_0 ∧ -p_692) -> ( b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0)
c  in CNF:
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨  b^{346, 3}_2
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨  b^{346, 3}_1
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨  p_692 ∨ -b^{346, 3}_0
c  in DIMACS:
-24068  24069 -24070  692  24071 0
-24068  24069 -24070  692  24072 0
-24068  24069 -24070  692 -24073 0

c  -2-1 --> break 
c    ( b^{346, 2}_2 ∧  b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧ -p_692) -> break
c  in CNF:
c    -b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨  b^{346, 2}_0 ∨  p_692 ∨ break
c  in DIMACS:
-24068 -24069  24070  692 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{346, 2}_2 ∧ -b^{346, 2}_1 ∧ -b^{346, 2}_0 ∧ true) 
c  in CNF:
c    -b^{346, 2}_2 ∨  b^{346, 2}_1 ∨  b^{346, 2}_0 ∨ false 
c  in DIMACS:
-24068  24069  24070  0

c  3 does not represent an automaton state.
c    -(-b^{346, 2}_2 ∧  b^{346, 2}_1 ∧  b^{346, 2}_0 ∧ true) 
c  in CNF:
c     b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ false 
c  in DIMACS:
 24068 -24069 -24070  0
c  -3 does not represent an automaton state.
c    -( b^{346, 2}_2 ∧  b^{346, 2}_1 ∧  b^{346, 2}_0 ∧ true) 
c  in CNF:
c    -b^{346, 2}_2 ∨ -b^{346, 2}_1 ∨ -b^{346, 2}_0 ∨ false 
c  in DIMACS:
-24068 -24069 -24070  0

c i = 3
c  -2+1 --> -1
c    ( b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧  p_1038) -> ( b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧  b^{346, 4}_0)
c  in CNF:
c    -b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨  b^{346, 4}_2
c    -b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_1
c    -b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨  b^{346, 4}_0
c  in DIMACS:
-24071 -24072  24073 -1038  24074 0
-24071 -24072  24073 -1038 -24075 0
-24071 -24072  24073 -1038  24076 0

c  -1+1 --> 0
c    ( b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0 ∧  p_1038) -> (-b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧ -b^{346, 4}_0)
c  in CNF:
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_2
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_1
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_0
c  in DIMACS:
-24071  24072 -24073 -1038 -24074 0
-24071  24072 -24073 -1038 -24075 0
-24071  24072 -24073 -1038 -24076 0

c  0+1 --> 1
c    (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧  p_1038) -> (-b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧  b^{346, 4}_0)
c  in CNF:
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_2
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_1
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨  b^{346, 4}_0
c  in DIMACS:
 24071  24072  24073 -1038 -24074 0
 24071  24072  24073 -1038 -24075 0
 24071  24072  24073 -1038  24076 0

c  1+1 --> 2
c    (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0 ∧  p_1038) -> (-b^{346, 4}_2 ∧  b^{346, 4}_1 ∧ -b^{346, 4}_0)
c  in CNF:
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_2
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨  b^{346, 4}_1
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ -p_1038 ∨ -b^{346, 4}_0
c  in DIMACS:
 24071  24072 -24073 -1038 -24074 0
 24071  24072 -24073 -1038  24075 0
 24071  24072 -24073 -1038 -24076 0

c  2+1 --> break 
c    (-b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧  p_1038) -> break
c  in CNF:
c     b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ -p_1038 ∨ break
c  in DIMACS:
 24071 -24072  24073 -1038 1162 0


c  2-1 --> 1
c    (-b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧ -p_1038) -> (-b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧  b^{346, 4}_0)
c  in CNF:
c     b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_2
c     b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_1
c     b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨  b^{346, 4}_0
c  in DIMACS:
 24071 -24072  24073  1038 -24074 0
 24071 -24072  24073  1038 -24075 0
 24071 -24072  24073  1038  24076 0

c  1-1 --> 0
c    (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0 ∧ -p_1038) -> (-b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧ -b^{346, 4}_0)
c  in CNF:
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_2
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_1
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_0
c  in DIMACS:
 24071  24072 -24073  1038 -24074 0
 24071  24072 -24073  1038 -24075 0
 24071  24072 -24073  1038 -24076 0

c  0-1 --> -1
c    (-b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧ -p_1038) -> ( b^{346, 4}_2 ∧ -b^{346, 4}_1 ∧  b^{346, 4}_0)
c  in CNF:
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨  b^{346, 4}_2
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_1
c     b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨  b^{346, 4}_0
c  in DIMACS:
 24071  24072  24073  1038  24074 0
 24071  24072  24073  1038 -24075 0
 24071  24072  24073  1038  24076 0

c  -1-1 --> -2
c    ( b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧  b^{346, 3}_0 ∧ -p_1038) -> ( b^{346, 4}_2 ∧  b^{346, 4}_1 ∧ -b^{346, 4}_0)
c  in CNF:
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨  b^{346, 4}_2
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨  b^{346, 4}_1
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨  p_1038 ∨ -b^{346, 4}_0
c  in DIMACS:
-24071  24072 -24073  1038  24074 0
-24071  24072 -24073  1038  24075 0
-24071  24072 -24073  1038 -24076 0

c  -2-1 --> break 
c    ( b^{346, 3}_2 ∧  b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧ -p_1038) -> break
c  in CNF:
c    -b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨  b^{346, 3}_0 ∨  p_1038 ∨ break
c  in DIMACS:
-24071 -24072  24073  1038 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{346, 3}_2 ∧ -b^{346, 3}_1 ∧ -b^{346, 3}_0 ∧ true) 
c  in CNF:
c    -b^{346, 3}_2 ∨  b^{346, 3}_1 ∨  b^{346, 3}_0 ∨ false 
c  in DIMACS:
-24071  24072  24073  0

c  3 does not represent an automaton state.
c    -(-b^{346, 3}_2 ∧  b^{346, 3}_1 ∧  b^{346, 3}_0 ∧ true) 
c  in CNF:
c     b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ false 
c  in DIMACS:
 24071 -24072 -24073  0
c  -3 does not represent an automaton state.
c    -( b^{346, 3}_2 ∧  b^{346, 3}_1 ∧  b^{346, 3}_0 ∧ true) 
c  in CNF:
c    -b^{346, 3}_2 ∨ -b^{346, 3}_1 ∨ -b^{346, 3}_0 ∨ false 
c  in DIMACS:
-24071 -24072 -24073  0

c INIT for k = 347
c    -b^{347, 1}_2
c    -b^{347, 1}_1
c    -b^{347, 1}_0
c  in DIMACS:
-24077 0
-24078 0
-24079 0

c Transitions for k = 347
c i = 1
c  -2+1 --> -1
c    ( b^{347, 1}_2 ∧  b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧  p_347) -> ( b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0)
c  in CNF:
c    -b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨  b^{347, 2}_2
c    -b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_1
c    -b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨  b^{347, 2}_0
c  in DIMACS:
-24077 -24078  24079 -347  24080 0
-24077 -24078  24079 -347 -24081 0
-24077 -24078  24079 -347  24082 0

c  -1+1 --> 0
c    ( b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧  b^{347, 1}_0 ∧  p_347) -> (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧ -b^{347, 2}_0)
c  in CNF:
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_2
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_1
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_0
c  in DIMACS:
-24077  24078 -24079 -347 -24080 0
-24077  24078 -24079 -347 -24081 0
-24077  24078 -24079 -347 -24082 0

c  0+1 --> 1
c    (-b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧  p_347) -> (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0)
c  in CNF:
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_2
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_1
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨  b^{347, 2}_0
c  in DIMACS:
 24077  24078  24079 -347 -24080 0
 24077  24078  24079 -347 -24081 0
 24077  24078  24079 -347  24082 0

c  1+1 --> 2
c    (-b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧  b^{347, 1}_0 ∧  p_347) -> (-b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0)
c  in CNF:
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_2
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨  b^{347, 2}_1
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ -p_347 ∨ -b^{347, 2}_0
c  in DIMACS:
 24077  24078 -24079 -347 -24080 0
 24077  24078 -24079 -347  24081 0
 24077  24078 -24079 -347 -24082 0

c  2+1 --> break 
c    (-b^{347, 1}_2 ∧  b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧  p_347) -> break
c  in CNF:
c     b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ -p_347 ∨ break
c  in DIMACS:
 24077 -24078  24079 -347 1162 0


c  2-1 --> 1
c    (-b^{347, 1}_2 ∧  b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧ -p_347) -> (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0)
c  in CNF:
c     b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_2
c     b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_1
c     b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨  b^{347, 2}_0
c  in DIMACS:
 24077 -24078  24079  347 -24080 0
 24077 -24078  24079  347 -24081 0
 24077 -24078  24079  347  24082 0

c  1-1 --> 0
c    (-b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧  b^{347, 1}_0 ∧ -p_347) -> (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧ -b^{347, 2}_0)
c  in CNF:
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_2
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_1
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_0
c  in DIMACS:
 24077  24078 -24079  347 -24080 0
 24077  24078 -24079  347 -24081 0
 24077  24078 -24079  347 -24082 0

c  0-1 --> -1
c    (-b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧ -p_347) -> ( b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0)
c  in CNF:
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨  b^{347, 2}_2
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_1
c     b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨  b^{347, 2}_0
c  in DIMACS:
 24077  24078  24079  347  24080 0
 24077  24078  24079  347 -24081 0
 24077  24078  24079  347  24082 0

c  -1-1 --> -2
c    ( b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧  b^{347, 1}_0 ∧ -p_347) -> ( b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0)
c  in CNF:
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨  b^{347, 2}_2
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨  b^{347, 2}_1
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨  p_347 ∨ -b^{347, 2}_0
c  in DIMACS:
-24077  24078 -24079  347  24080 0
-24077  24078 -24079  347  24081 0
-24077  24078 -24079  347 -24082 0

c  -2-1 --> break 
c    ( b^{347, 1}_2 ∧  b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧ -p_347) -> break
c  in CNF:
c    -b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨  b^{347, 1}_0 ∨  p_347 ∨ break
c  in DIMACS:
-24077 -24078  24079  347 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{347, 1}_2 ∧ -b^{347, 1}_1 ∧ -b^{347, 1}_0 ∧ true) 
c  in CNF:
c    -b^{347, 1}_2 ∨  b^{347, 1}_1 ∨  b^{347, 1}_0 ∨ false 
c  in DIMACS:
-24077  24078  24079  0

c  3 does not represent an automaton state.
c    -(-b^{347, 1}_2 ∧  b^{347, 1}_1 ∧  b^{347, 1}_0 ∧ true) 
c  in CNF:
c     b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ false 
c  in DIMACS:
 24077 -24078 -24079  0
c  -3 does not represent an automaton state.
c    -( b^{347, 1}_2 ∧  b^{347, 1}_1 ∧  b^{347, 1}_0 ∧ true) 
c  in CNF:
c    -b^{347, 1}_2 ∨ -b^{347, 1}_1 ∨ -b^{347, 1}_0 ∨ false 
c  in DIMACS:
-24077 -24078 -24079  0

c i = 2
c  -2+1 --> -1
c    ( b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧  p_694) -> ( b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0)
c  in CNF:
c    -b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨  b^{347, 3}_2
c    -b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_1
c    -b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨  b^{347, 3}_0
c  in DIMACS:
-24080 -24081  24082 -694  24083 0
-24080 -24081  24082 -694 -24084 0
-24080 -24081  24082 -694  24085 0

c  -1+1 --> 0
c    ( b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0 ∧  p_694) -> (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧ -b^{347, 3}_0)
c  in CNF:
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_2
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_1
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_0
c  in DIMACS:
-24080  24081 -24082 -694 -24083 0
-24080  24081 -24082 -694 -24084 0
-24080  24081 -24082 -694 -24085 0

c  0+1 --> 1
c    (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧  p_694) -> (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0)
c  in CNF:
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_2
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_1
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨  b^{347, 3}_0
c  in DIMACS:
 24080  24081  24082 -694 -24083 0
 24080  24081  24082 -694 -24084 0
 24080  24081  24082 -694  24085 0

c  1+1 --> 2
c    (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0 ∧  p_694) -> (-b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0)
c  in CNF:
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_2
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨  b^{347, 3}_1
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ -p_694 ∨ -b^{347, 3}_0
c  in DIMACS:
 24080  24081 -24082 -694 -24083 0
 24080  24081 -24082 -694  24084 0
 24080  24081 -24082 -694 -24085 0

c  2+1 --> break 
c    (-b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧  p_694) -> break
c  in CNF:
c     b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ -p_694 ∨ break
c  in DIMACS:
 24080 -24081  24082 -694 1162 0


c  2-1 --> 1
c    (-b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧ -p_694) -> (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0)
c  in CNF:
c     b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_2
c     b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_1
c     b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨  b^{347, 3}_0
c  in DIMACS:
 24080 -24081  24082  694 -24083 0
 24080 -24081  24082  694 -24084 0
 24080 -24081  24082  694  24085 0

c  1-1 --> 0
c    (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0 ∧ -p_694) -> (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧ -b^{347, 3}_0)
c  in CNF:
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_2
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_1
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_0
c  in DIMACS:
 24080  24081 -24082  694 -24083 0
 24080  24081 -24082  694 -24084 0
 24080  24081 -24082  694 -24085 0

c  0-1 --> -1
c    (-b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧ -p_694) -> ( b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0)
c  in CNF:
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨  b^{347, 3}_2
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_1
c     b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨  b^{347, 3}_0
c  in DIMACS:
 24080  24081  24082  694  24083 0
 24080  24081  24082  694 -24084 0
 24080  24081  24082  694  24085 0

c  -1-1 --> -2
c    ( b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧  b^{347, 2}_0 ∧ -p_694) -> ( b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0)
c  in CNF:
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨  b^{347, 3}_2
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨  b^{347, 3}_1
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨  p_694 ∨ -b^{347, 3}_0
c  in DIMACS:
-24080  24081 -24082  694  24083 0
-24080  24081 -24082  694  24084 0
-24080  24081 -24082  694 -24085 0

c  -2-1 --> break 
c    ( b^{347, 2}_2 ∧  b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧ -p_694) -> break
c  in CNF:
c    -b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨  b^{347, 2}_0 ∨  p_694 ∨ break
c  in DIMACS:
-24080 -24081  24082  694 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{347, 2}_2 ∧ -b^{347, 2}_1 ∧ -b^{347, 2}_0 ∧ true) 
c  in CNF:
c    -b^{347, 2}_2 ∨  b^{347, 2}_1 ∨  b^{347, 2}_0 ∨ false 
c  in DIMACS:
-24080  24081  24082  0

c  3 does not represent an automaton state.
c    -(-b^{347, 2}_2 ∧  b^{347, 2}_1 ∧  b^{347, 2}_0 ∧ true) 
c  in CNF:
c     b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ false 
c  in DIMACS:
 24080 -24081 -24082  0
c  -3 does not represent an automaton state.
c    -( b^{347, 2}_2 ∧  b^{347, 2}_1 ∧  b^{347, 2}_0 ∧ true) 
c  in CNF:
c    -b^{347, 2}_2 ∨ -b^{347, 2}_1 ∨ -b^{347, 2}_0 ∨ false 
c  in DIMACS:
-24080 -24081 -24082  0

c i = 3
c  -2+1 --> -1
c    ( b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧  p_1041) -> ( b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧  b^{347, 4}_0)
c  in CNF:
c    -b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨  b^{347, 4}_2
c    -b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_1
c    -b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨  b^{347, 4}_0
c  in DIMACS:
-24083 -24084  24085 -1041  24086 0
-24083 -24084  24085 -1041 -24087 0
-24083 -24084  24085 -1041  24088 0

c  -1+1 --> 0
c    ( b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0 ∧  p_1041) -> (-b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧ -b^{347, 4}_0)
c  in CNF:
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_2
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_1
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_0
c  in DIMACS:
-24083  24084 -24085 -1041 -24086 0
-24083  24084 -24085 -1041 -24087 0
-24083  24084 -24085 -1041 -24088 0

c  0+1 --> 1
c    (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧  p_1041) -> (-b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧  b^{347, 4}_0)
c  in CNF:
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_2
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_1
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨  b^{347, 4}_0
c  in DIMACS:
 24083  24084  24085 -1041 -24086 0
 24083  24084  24085 -1041 -24087 0
 24083  24084  24085 -1041  24088 0

c  1+1 --> 2
c    (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0 ∧  p_1041) -> (-b^{347, 4}_2 ∧  b^{347, 4}_1 ∧ -b^{347, 4}_0)
c  in CNF:
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_2
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨  b^{347, 4}_1
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ -p_1041 ∨ -b^{347, 4}_0
c  in DIMACS:
 24083  24084 -24085 -1041 -24086 0
 24083  24084 -24085 -1041  24087 0
 24083  24084 -24085 -1041 -24088 0

c  2+1 --> break 
c    (-b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧  p_1041) -> break
c  in CNF:
c     b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ -p_1041 ∨ break
c  in DIMACS:
 24083 -24084  24085 -1041 1162 0


c  2-1 --> 1
c    (-b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧ -p_1041) -> (-b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧  b^{347, 4}_0)
c  in CNF:
c     b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_2
c     b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_1
c     b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨  b^{347, 4}_0
c  in DIMACS:
 24083 -24084  24085  1041 -24086 0
 24083 -24084  24085  1041 -24087 0
 24083 -24084  24085  1041  24088 0

c  1-1 --> 0
c    (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0 ∧ -p_1041) -> (-b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧ -b^{347, 4}_0)
c  in CNF:
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_2
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_1
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_0
c  in DIMACS:
 24083  24084 -24085  1041 -24086 0
 24083  24084 -24085  1041 -24087 0
 24083  24084 -24085  1041 -24088 0

c  0-1 --> -1
c    (-b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧ -p_1041) -> ( b^{347, 4}_2 ∧ -b^{347, 4}_1 ∧  b^{347, 4}_0)
c  in CNF:
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨  b^{347, 4}_2
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_1
c     b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨  b^{347, 4}_0
c  in DIMACS:
 24083  24084  24085  1041  24086 0
 24083  24084  24085  1041 -24087 0
 24083  24084  24085  1041  24088 0

c  -1-1 --> -2
c    ( b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧  b^{347, 3}_0 ∧ -p_1041) -> ( b^{347, 4}_2 ∧  b^{347, 4}_1 ∧ -b^{347, 4}_0)
c  in CNF:
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨  b^{347, 4}_2
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨  b^{347, 4}_1
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨  p_1041 ∨ -b^{347, 4}_0
c  in DIMACS:
-24083  24084 -24085  1041  24086 0
-24083  24084 -24085  1041  24087 0
-24083  24084 -24085  1041 -24088 0

c  -2-1 --> break 
c    ( b^{347, 3}_2 ∧  b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧ -p_1041) -> break
c  in CNF:
c    -b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨  b^{347, 3}_0 ∨  p_1041 ∨ break
c  in DIMACS:
-24083 -24084  24085  1041 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{347, 3}_2 ∧ -b^{347, 3}_1 ∧ -b^{347, 3}_0 ∧ true) 
c  in CNF:
c    -b^{347, 3}_2 ∨  b^{347, 3}_1 ∨  b^{347, 3}_0 ∨ false 
c  in DIMACS:
-24083  24084  24085  0

c  3 does not represent an automaton state.
c    -(-b^{347, 3}_2 ∧  b^{347, 3}_1 ∧  b^{347, 3}_0 ∧ true) 
c  in CNF:
c     b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ false 
c  in DIMACS:
 24083 -24084 -24085  0
c  -3 does not represent an automaton state.
c    -( b^{347, 3}_2 ∧  b^{347, 3}_1 ∧  b^{347, 3}_0 ∧ true) 
c  in CNF:
c    -b^{347, 3}_2 ∨ -b^{347, 3}_1 ∨ -b^{347, 3}_0 ∨ false 
c  in DIMACS:
-24083 -24084 -24085  0

c INIT for k = 348
c    -b^{348, 1}_2
c    -b^{348, 1}_1
c    -b^{348, 1}_0
c  in DIMACS:
-24089 0
-24090 0
-24091 0

c Transitions for k = 348
c i = 1
c  -2+1 --> -1
c    ( b^{348, 1}_2 ∧  b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧  p_348) -> ( b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0)
c  in CNF:
c    -b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨  b^{348, 2}_2
c    -b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_1
c    -b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨  b^{348, 2}_0
c  in DIMACS:
-24089 -24090  24091 -348  24092 0
-24089 -24090  24091 -348 -24093 0
-24089 -24090  24091 -348  24094 0

c  -1+1 --> 0
c    ( b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧  b^{348, 1}_0 ∧  p_348) -> (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧ -b^{348, 2}_0)
c  in CNF:
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_2
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_1
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_0
c  in DIMACS:
-24089  24090 -24091 -348 -24092 0
-24089  24090 -24091 -348 -24093 0
-24089  24090 -24091 -348 -24094 0

c  0+1 --> 1
c    (-b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧  p_348) -> (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0)
c  in CNF:
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_2
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_1
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨  b^{348, 2}_0
c  in DIMACS:
 24089  24090  24091 -348 -24092 0
 24089  24090  24091 -348 -24093 0
 24089  24090  24091 -348  24094 0

c  1+1 --> 2
c    (-b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧  b^{348, 1}_0 ∧  p_348) -> (-b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0)
c  in CNF:
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_2
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨  b^{348, 2}_1
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ -p_348 ∨ -b^{348, 2}_0
c  in DIMACS:
 24089  24090 -24091 -348 -24092 0
 24089  24090 -24091 -348  24093 0
 24089  24090 -24091 -348 -24094 0

c  2+1 --> break 
c    (-b^{348, 1}_2 ∧  b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧  p_348) -> break
c  in CNF:
c     b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ -p_348 ∨ break
c  in DIMACS:
 24089 -24090  24091 -348 1162 0


c  2-1 --> 1
c    (-b^{348, 1}_2 ∧  b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧ -p_348) -> (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0)
c  in CNF:
c     b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_2
c     b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_1
c     b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨  b^{348, 2}_0
c  in DIMACS:
 24089 -24090  24091  348 -24092 0
 24089 -24090  24091  348 -24093 0
 24089 -24090  24091  348  24094 0

c  1-1 --> 0
c    (-b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧  b^{348, 1}_0 ∧ -p_348) -> (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧ -b^{348, 2}_0)
c  in CNF:
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_2
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_1
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_0
c  in DIMACS:
 24089  24090 -24091  348 -24092 0
 24089  24090 -24091  348 -24093 0
 24089  24090 -24091  348 -24094 0

c  0-1 --> -1
c    (-b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧ -p_348) -> ( b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0)
c  in CNF:
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨  b^{348, 2}_2
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_1
c     b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨  b^{348, 2}_0
c  in DIMACS:
 24089  24090  24091  348  24092 0
 24089  24090  24091  348 -24093 0
 24089  24090  24091  348  24094 0

c  -1-1 --> -2
c    ( b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧  b^{348, 1}_0 ∧ -p_348) -> ( b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0)
c  in CNF:
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨  b^{348, 2}_2
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨  b^{348, 2}_1
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨  p_348 ∨ -b^{348, 2}_0
c  in DIMACS:
-24089  24090 -24091  348  24092 0
-24089  24090 -24091  348  24093 0
-24089  24090 -24091  348 -24094 0

c  -2-1 --> break 
c    ( b^{348, 1}_2 ∧  b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧ -p_348) -> break
c  in CNF:
c    -b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨  b^{348, 1}_0 ∨  p_348 ∨ break
c  in DIMACS:
-24089 -24090  24091  348 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{348, 1}_2 ∧ -b^{348, 1}_1 ∧ -b^{348, 1}_0 ∧ true) 
c  in CNF:
c    -b^{348, 1}_2 ∨  b^{348, 1}_1 ∨  b^{348, 1}_0 ∨ false 
c  in DIMACS:
-24089  24090  24091  0

c  3 does not represent an automaton state.
c    -(-b^{348, 1}_2 ∧  b^{348, 1}_1 ∧  b^{348, 1}_0 ∧ true) 
c  in CNF:
c     b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ false 
c  in DIMACS:
 24089 -24090 -24091  0
c  -3 does not represent an automaton state.
c    -( b^{348, 1}_2 ∧  b^{348, 1}_1 ∧  b^{348, 1}_0 ∧ true) 
c  in CNF:
c    -b^{348, 1}_2 ∨ -b^{348, 1}_1 ∨ -b^{348, 1}_0 ∨ false 
c  in DIMACS:
-24089 -24090 -24091  0

c i = 2
c  -2+1 --> -1
c    ( b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧  p_696) -> ( b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0)
c  in CNF:
c    -b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨  b^{348, 3}_2
c    -b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_1
c    -b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨  b^{348, 3}_0
c  in DIMACS:
-24092 -24093  24094 -696  24095 0
-24092 -24093  24094 -696 -24096 0
-24092 -24093  24094 -696  24097 0

c  -1+1 --> 0
c    ( b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0 ∧  p_696) -> (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧ -b^{348, 3}_0)
c  in CNF:
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_2
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_1
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_0
c  in DIMACS:
-24092  24093 -24094 -696 -24095 0
-24092  24093 -24094 -696 -24096 0
-24092  24093 -24094 -696 -24097 0

c  0+1 --> 1
c    (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧  p_696) -> (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0)
c  in CNF:
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_2
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_1
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨  b^{348, 3}_0
c  in DIMACS:
 24092  24093  24094 -696 -24095 0
 24092  24093  24094 -696 -24096 0
 24092  24093  24094 -696  24097 0

c  1+1 --> 2
c    (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0 ∧  p_696) -> (-b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0)
c  in CNF:
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_2
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨  b^{348, 3}_1
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ -p_696 ∨ -b^{348, 3}_0
c  in DIMACS:
 24092  24093 -24094 -696 -24095 0
 24092  24093 -24094 -696  24096 0
 24092  24093 -24094 -696 -24097 0

c  2+1 --> break 
c    (-b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧  p_696) -> break
c  in CNF:
c     b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ -p_696 ∨ break
c  in DIMACS:
 24092 -24093  24094 -696 1162 0


c  2-1 --> 1
c    (-b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧ -p_696) -> (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0)
c  in CNF:
c     b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_2
c     b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_1
c     b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨  b^{348, 3}_0
c  in DIMACS:
 24092 -24093  24094  696 -24095 0
 24092 -24093  24094  696 -24096 0
 24092 -24093  24094  696  24097 0

c  1-1 --> 0
c    (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0 ∧ -p_696) -> (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧ -b^{348, 3}_0)
c  in CNF:
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_2
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_1
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_0
c  in DIMACS:
 24092  24093 -24094  696 -24095 0
 24092  24093 -24094  696 -24096 0
 24092  24093 -24094  696 -24097 0

c  0-1 --> -1
c    (-b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧ -p_696) -> ( b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0)
c  in CNF:
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨  b^{348, 3}_2
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_1
c     b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨  b^{348, 3}_0
c  in DIMACS:
 24092  24093  24094  696  24095 0
 24092  24093  24094  696 -24096 0
 24092  24093  24094  696  24097 0

c  -1-1 --> -2
c    ( b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧  b^{348, 2}_0 ∧ -p_696) -> ( b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0)
c  in CNF:
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨  b^{348, 3}_2
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨  b^{348, 3}_1
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨  p_696 ∨ -b^{348, 3}_0
c  in DIMACS:
-24092  24093 -24094  696  24095 0
-24092  24093 -24094  696  24096 0
-24092  24093 -24094  696 -24097 0

c  -2-1 --> break 
c    ( b^{348, 2}_2 ∧  b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧ -p_696) -> break
c  in CNF:
c    -b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨  b^{348, 2}_0 ∨  p_696 ∨ break
c  in DIMACS:
-24092 -24093  24094  696 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{348, 2}_2 ∧ -b^{348, 2}_1 ∧ -b^{348, 2}_0 ∧ true) 
c  in CNF:
c    -b^{348, 2}_2 ∨  b^{348, 2}_1 ∨  b^{348, 2}_0 ∨ false 
c  in DIMACS:
-24092  24093  24094  0

c  3 does not represent an automaton state.
c    -(-b^{348, 2}_2 ∧  b^{348, 2}_1 ∧  b^{348, 2}_0 ∧ true) 
c  in CNF:
c     b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ false 
c  in DIMACS:
 24092 -24093 -24094  0
c  -3 does not represent an automaton state.
c    -( b^{348, 2}_2 ∧  b^{348, 2}_1 ∧  b^{348, 2}_0 ∧ true) 
c  in CNF:
c    -b^{348, 2}_2 ∨ -b^{348, 2}_1 ∨ -b^{348, 2}_0 ∨ false 
c  in DIMACS:
-24092 -24093 -24094  0

c i = 3
c  -2+1 --> -1
c    ( b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧  p_1044) -> ( b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧  b^{348, 4}_0)
c  in CNF:
c    -b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨  b^{348, 4}_2
c    -b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_1
c    -b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨  b^{348, 4}_0
c  in DIMACS:
-24095 -24096  24097 -1044  24098 0
-24095 -24096  24097 -1044 -24099 0
-24095 -24096  24097 -1044  24100 0

c  -1+1 --> 0
c    ( b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0 ∧  p_1044) -> (-b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧ -b^{348, 4}_0)
c  in CNF:
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_2
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_1
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_0
c  in DIMACS:
-24095  24096 -24097 -1044 -24098 0
-24095  24096 -24097 -1044 -24099 0
-24095  24096 -24097 -1044 -24100 0

c  0+1 --> 1
c    (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧  p_1044) -> (-b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧  b^{348, 4}_0)
c  in CNF:
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_2
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_1
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨  b^{348, 4}_0
c  in DIMACS:
 24095  24096  24097 -1044 -24098 0
 24095  24096  24097 -1044 -24099 0
 24095  24096  24097 -1044  24100 0

c  1+1 --> 2
c    (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0 ∧  p_1044) -> (-b^{348, 4}_2 ∧  b^{348, 4}_1 ∧ -b^{348, 4}_0)
c  in CNF:
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_2
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨  b^{348, 4}_1
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ -p_1044 ∨ -b^{348, 4}_0
c  in DIMACS:
 24095  24096 -24097 -1044 -24098 0
 24095  24096 -24097 -1044  24099 0
 24095  24096 -24097 -1044 -24100 0

c  2+1 --> break 
c    (-b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧  p_1044) -> break
c  in CNF:
c     b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ -p_1044 ∨ break
c  in DIMACS:
 24095 -24096  24097 -1044 1162 0


c  2-1 --> 1
c    (-b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧ -p_1044) -> (-b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧  b^{348, 4}_0)
c  in CNF:
c     b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_2
c     b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_1
c     b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨  b^{348, 4}_0
c  in DIMACS:
 24095 -24096  24097  1044 -24098 0
 24095 -24096  24097  1044 -24099 0
 24095 -24096  24097  1044  24100 0

c  1-1 --> 0
c    (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0 ∧ -p_1044) -> (-b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧ -b^{348, 4}_0)
c  in CNF:
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_2
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_1
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_0
c  in DIMACS:
 24095  24096 -24097  1044 -24098 0
 24095  24096 -24097  1044 -24099 0
 24095  24096 -24097  1044 -24100 0

c  0-1 --> -1
c    (-b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧ -p_1044) -> ( b^{348, 4}_2 ∧ -b^{348, 4}_1 ∧  b^{348, 4}_0)
c  in CNF:
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨  b^{348, 4}_2
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_1
c     b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨  b^{348, 4}_0
c  in DIMACS:
 24095  24096  24097  1044  24098 0
 24095  24096  24097  1044 -24099 0
 24095  24096  24097  1044  24100 0

c  -1-1 --> -2
c    ( b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧  b^{348, 3}_0 ∧ -p_1044) -> ( b^{348, 4}_2 ∧  b^{348, 4}_1 ∧ -b^{348, 4}_0)
c  in CNF:
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨  b^{348, 4}_2
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨  b^{348, 4}_1
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨  p_1044 ∨ -b^{348, 4}_0
c  in DIMACS:
-24095  24096 -24097  1044  24098 0
-24095  24096 -24097  1044  24099 0
-24095  24096 -24097  1044 -24100 0

c  -2-1 --> break 
c    ( b^{348, 3}_2 ∧  b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧ -p_1044) -> break
c  in CNF:
c    -b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨  b^{348, 3}_0 ∨  p_1044 ∨ break
c  in DIMACS:
-24095 -24096  24097  1044 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{348, 3}_2 ∧ -b^{348, 3}_1 ∧ -b^{348, 3}_0 ∧ true) 
c  in CNF:
c    -b^{348, 3}_2 ∨  b^{348, 3}_1 ∨  b^{348, 3}_0 ∨ false 
c  in DIMACS:
-24095  24096  24097  0

c  3 does not represent an automaton state.
c    -(-b^{348, 3}_2 ∧  b^{348, 3}_1 ∧  b^{348, 3}_0 ∧ true) 
c  in CNF:
c     b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ false 
c  in DIMACS:
 24095 -24096 -24097  0
c  -3 does not represent an automaton state.
c    -( b^{348, 3}_2 ∧  b^{348, 3}_1 ∧  b^{348, 3}_0 ∧ true) 
c  in CNF:
c    -b^{348, 3}_2 ∨ -b^{348, 3}_1 ∨ -b^{348, 3}_0 ∨ false 
c  in DIMACS:
-24095 -24096 -24097  0

c INIT for k = 349
c    -b^{349, 1}_2
c    -b^{349, 1}_1
c    -b^{349, 1}_0
c  in DIMACS:
-24101 0
-24102 0
-24103 0

c Transitions for k = 349
c i = 1
c  -2+1 --> -1
c    ( b^{349, 1}_2 ∧  b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧  p_349) -> ( b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0)
c  in CNF:
c    -b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨  b^{349, 2}_2
c    -b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_1
c    -b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨  b^{349, 2}_0
c  in DIMACS:
-24101 -24102  24103 -349  24104 0
-24101 -24102  24103 -349 -24105 0
-24101 -24102  24103 -349  24106 0

c  -1+1 --> 0
c    ( b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧  b^{349, 1}_0 ∧  p_349) -> (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧ -b^{349, 2}_0)
c  in CNF:
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_2
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_1
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_0
c  in DIMACS:
-24101  24102 -24103 -349 -24104 0
-24101  24102 -24103 -349 -24105 0
-24101  24102 -24103 -349 -24106 0

c  0+1 --> 1
c    (-b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧  p_349) -> (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0)
c  in CNF:
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_2
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_1
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨  b^{349, 2}_0
c  in DIMACS:
 24101  24102  24103 -349 -24104 0
 24101  24102  24103 -349 -24105 0
 24101  24102  24103 -349  24106 0

c  1+1 --> 2
c    (-b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧  b^{349, 1}_0 ∧  p_349) -> (-b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0)
c  in CNF:
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_2
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨  b^{349, 2}_1
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ -p_349 ∨ -b^{349, 2}_0
c  in DIMACS:
 24101  24102 -24103 -349 -24104 0
 24101  24102 -24103 -349  24105 0
 24101  24102 -24103 -349 -24106 0

c  2+1 --> break 
c    (-b^{349, 1}_2 ∧  b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧  p_349) -> break
c  in CNF:
c     b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ -p_349 ∨ break
c  in DIMACS:
 24101 -24102  24103 -349 1162 0


c  2-1 --> 1
c    (-b^{349, 1}_2 ∧  b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧ -p_349) -> (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0)
c  in CNF:
c     b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_2
c     b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_1
c     b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨  b^{349, 2}_0
c  in DIMACS:
 24101 -24102  24103  349 -24104 0
 24101 -24102  24103  349 -24105 0
 24101 -24102  24103  349  24106 0

c  1-1 --> 0
c    (-b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧  b^{349, 1}_0 ∧ -p_349) -> (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧ -b^{349, 2}_0)
c  in CNF:
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_2
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_1
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_0
c  in DIMACS:
 24101  24102 -24103  349 -24104 0
 24101  24102 -24103  349 -24105 0
 24101  24102 -24103  349 -24106 0

c  0-1 --> -1
c    (-b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧ -p_349) -> ( b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0)
c  in CNF:
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨  b^{349, 2}_2
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_1
c     b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨  b^{349, 2}_0
c  in DIMACS:
 24101  24102  24103  349  24104 0
 24101  24102  24103  349 -24105 0
 24101  24102  24103  349  24106 0

c  -1-1 --> -2
c    ( b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧  b^{349, 1}_0 ∧ -p_349) -> ( b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0)
c  in CNF:
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨  b^{349, 2}_2
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨  b^{349, 2}_1
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨  p_349 ∨ -b^{349, 2}_0
c  in DIMACS:
-24101  24102 -24103  349  24104 0
-24101  24102 -24103  349  24105 0
-24101  24102 -24103  349 -24106 0

c  -2-1 --> break 
c    ( b^{349, 1}_2 ∧  b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧ -p_349) -> break
c  in CNF:
c    -b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨  b^{349, 1}_0 ∨  p_349 ∨ break
c  in DIMACS:
-24101 -24102  24103  349 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{349, 1}_2 ∧ -b^{349, 1}_1 ∧ -b^{349, 1}_0 ∧ true) 
c  in CNF:
c    -b^{349, 1}_2 ∨  b^{349, 1}_1 ∨  b^{349, 1}_0 ∨ false 
c  in DIMACS:
-24101  24102  24103  0

c  3 does not represent an automaton state.
c    -(-b^{349, 1}_2 ∧  b^{349, 1}_1 ∧  b^{349, 1}_0 ∧ true) 
c  in CNF:
c     b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ false 
c  in DIMACS:
 24101 -24102 -24103  0
c  -3 does not represent an automaton state.
c    -( b^{349, 1}_2 ∧  b^{349, 1}_1 ∧  b^{349, 1}_0 ∧ true) 
c  in CNF:
c    -b^{349, 1}_2 ∨ -b^{349, 1}_1 ∨ -b^{349, 1}_0 ∨ false 
c  in DIMACS:
-24101 -24102 -24103  0

c i = 2
c  -2+1 --> -1
c    ( b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧  p_698) -> ( b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0)
c  in CNF:
c    -b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨  b^{349, 3}_2
c    -b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_1
c    -b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨  b^{349, 3}_0
c  in DIMACS:
-24104 -24105  24106 -698  24107 0
-24104 -24105  24106 -698 -24108 0
-24104 -24105  24106 -698  24109 0

c  -1+1 --> 0
c    ( b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0 ∧  p_698) -> (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧ -b^{349, 3}_0)
c  in CNF:
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_2
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_1
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_0
c  in DIMACS:
-24104  24105 -24106 -698 -24107 0
-24104  24105 -24106 -698 -24108 0
-24104  24105 -24106 -698 -24109 0

c  0+1 --> 1
c    (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧  p_698) -> (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0)
c  in CNF:
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_2
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_1
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨  b^{349, 3}_0
c  in DIMACS:
 24104  24105  24106 -698 -24107 0
 24104  24105  24106 -698 -24108 0
 24104  24105  24106 -698  24109 0

c  1+1 --> 2
c    (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0 ∧  p_698) -> (-b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0)
c  in CNF:
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_2
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨  b^{349, 3}_1
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ -p_698 ∨ -b^{349, 3}_0
c  in DIMACS:
 24104  24105 -24106 -698 -24107 0
 24104  24105 -24106 -698  24108 0
 24104  24105 -24106 -698 -24109 0

c  2+1 --> break 
c    (-b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧  p_698) -> break
c  in CNF:
c     b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ -p_698 ∨ break
c  in DIMACS:
 24104 -24105  24106 -698 1162 0


c  2-1 --> 1
c    (-b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧ -p_698) -> (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0)
c  in CNF:
c     b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_2
c     b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_1
c     b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨  b^{349, 3}_0
c  in DIMACS:
 24104 -24105  24106  698 -24107 0
 24104 -24105  24106  698 -24108 0
 24104 -24105  24106  698  24109 0

c  1-1 --> 0
c    (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0 ∧ -p_698) -> (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧ -b^{349, 3}_0)
c  in CNF:
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_2
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_1
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_0
c  in DIMACS:
 24104  24105 -24106  698 -24107 0
 24104  24105 -24106  698 -24108 0
 24104  24105 -24106  698 -24109 0

c  0-1 --> -1
c    (-b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧ -p_698) -> ( b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0)
c  in CNF:
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨  b^{349, 3}_2
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_1
c     b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨  b^{349, 3}_0
c  in DIMACS:
 24104  24105  24106  698  24107 0
 24104  24105  24106  698 -24108 0
 24104  24105  24106  698  24109 0

c  -1-1 --> -2
c    ( b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧  b^{349, 2}_0 ∧ -p_698) -> ( b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0)
c  in CNF:
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨  b^{349, 3}_2
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨  b^{349, 3}_1
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨  p_698 ∨ -b^{349, 3}_0
c  in DIMACS:
-24104  24105 -24106  698  24107 0
-24104  24105 -24106  698  24108 0
-24104  24105 -24106  698 -24109 0

c  -2-1 --> break 
c    ( b^{349, 2}_2 ∧  b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧ -p_698) -> break
c  in CNF:
c    -b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨  b^{349, 2}_0 ∨  p_698 ∨ break
c  in DIMACS:
-24104 -24105  24106  698 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{349, 2}_2 ∧ -b^{349, 2}_1 ∧ -b^{349, 2}_0 ∧ true) 
c  in CNF:
c    -b^{349, 2}_2 ∨  b^{349, 2}_1 ∨  b^{349, 2}_0 ∨ false 
c  in DIMACS:
-24104  24105  24106  0

c  3 does not represent an automaton state.
c    -(-b^{349, 2}_2 ∧  b^{349, 2}_1 ∧  b^{349, 2}_0 ∧ true) 
c  in CNF:
c     b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ false 
c  in DIMACS:
 24104 -24105 -24106  0
c  -3 does not represent an automaton state.
c    -( b^{349, 2}_2 ∧  b^{349, 2}_1 ∧  b^{349, 2}_0 ∧ true) 
c  in CNF:
c    -b^{349, 2}_2 ∨ -b^{349, 2}_1 ∨ -b^{349, 2}_0 ∨ false 
c  in DIMACS:
-24104 -24105 -24106  0

c i = 3
c  -2+1 --> -1
c    ( b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧  p_1047) -> ( b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧  b^{349, 4}_0)
c  in CNF:
c    -b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨  b^{349, 4}_2
c    -b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_1
c    -b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨  b^{349, 4}_0
c  in DIMACS:
-24107 -24108  24109 -1047  24110 0
-24107 -24108  24109 -1047 -24111 0
-24107 -24108  24109 -1047  24112 0

c  -1+1 --> 0
c    ( b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0 ∧  p_1047) -> (-b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧ -b^{349, 4}_0)
c  in CNF:
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_2
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_1
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_0
c  in DIMACS:
-24107  24108 -24109 -1047 -24110 0
-24107  24108 -24109 -1047 -24111 0
-24107  24108 -24109 -1047 -24112 0

c  0+1 --> 1
c    (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧  p_1047) -> (-b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧  b^{349, 4}_0)
c  in CNF:
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_2
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_1
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨  b^{349, 4}_0
c  in DIMACS:
 24107  24108  24109 -1047 -24110 0
 24107  24108  24109 -1047 -24111 0
 24107  24108  24109 -1047  24112 0

c  1+1 --> 2
c    (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0 ∧  p_1047) -> (-b^{349, 4}_2 ∧  b^{349, 4}_1 ∧ -b^{349, 4}_0)
c  in CNF:
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_2
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨  b^{349, 4}_1
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ -p_1047 ∨ -b^{349, 4}_0
c  in DIMACS:
 24107  24108 -24109 -1047 -24110 0
 24107  24108 -24109 -1047  24111 0
 24107  24108 -24109 -1047 -24112 0

c  2+1 --> break 
c    (-b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧  p_1047) -> break
c  in CNF:
c     b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ -p_1047 ∨ break
c  in DIMACS:
 24107 -24108  24109 -1047 1162 0


c  2-1 --> 1
c    (-b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧ -p_1047) -> (-b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧  b^{349, 4}_0)
c  in CNF:
c     b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_2
c     b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_1
c     b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨  b^{349, 4}_0
c  in DIMACS:
 24107 -24108  24109  1047 -24110 0
 24107 -24108  24109  1047 -24111 0
 24107 -24108  24109  1047  24112 0

c  1-1 --> 0
c    (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0 ∧ -p_1047) -> (-b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧ -b^{349, 4}_0)
c  in CNF:
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_2
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_1
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_0
c  in DIMACS:
 24107  24108 -24109  1047 -24110 0
 24107  24108 -24109  1047 -24111 0
 24107  24108 -24109  1047 -24112 0

c  0-1 --> -1
c    (-b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧ -p_1047) -> ( b^{349, 4}_2 ∧ -b^{349, 4}_1 ∧  b^{349, 4}_0)
c  in CNF:
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨  b^{349, 4}_2
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_1
c     b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨  b^{349, 4}_0
c  in DIMACS:
 24107  24108  24109  1047  24110 0
 24107  24108  24109  1047 -24111 0
 24107  24108  24109  1047  24112 0

c  -1-1 --> -2
c    ( b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧  b^{349, 3}_0 ∧ -p_1047) -> ( b^{349, 4}_2 ∧  b^{349, 4}_1 ∧ -b^{349, 4}_0)
c  in CNF:
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨  b^{349, 4}_2
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨  b^{349, 4}_1
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨  p_1047 ∨ -b^{349, 4}_0
c  in DIMACS:
-24107  24108 -24109  1047  24110 0
-24107  24108 -24109  1047  24111 0
-24107  24108 -24109  1047 -24112 0

c  -2-1 --> break 
c    ( b^{349, 3}_2 ∧  b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧ -p_1047) -> break
c  in CNF:
c    -b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨  b^{349, 3}_0 ∨  p_1047 ∨ break
c  in DIMACS:
-24107 -24108  24109  1047 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{349, 3}_2 ∧ -b^{349, 3}_1 ∧ -b^{349, 3}_0 ∧ true) 
c  in CNF:
c    -b^{349, 3}_2 ∨  b^{349, 3}_1 ∨  b^{349, 3}_0 ∨ false 
c  in DIMACS:
-24107  24108  24109  0

c  3 does not represent an automaton state.
c    -(-b^{349, 3}_2 ∧  b^{349, 3}_1 ∧  b^{349, 3}_0 ∧ true) 
c  in CNF:
c     b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ false 
c  in DIMACS:
 24107 -24108 -24109  0
c  -3 does not represent an automaton state.
c    -( b^{349, 3}_2 ∧  b^{349, 3}_1 ∧  b^{349, 3}_0 ∧ true) 
c  in CNF:
c    -b^{349, 3}_2 ∨ -b^{349, 3}_1 ∨ -b^{349, 3}_0 ∨ false 
c  in DIMACS:
-24107 -24108 -24109  0

c INIT for k = 350
c    -b^{350, 1}_2
c    -b^{350, 1}_1
c    -b^{350, 1}_0
c  in DIMACS:
-24113 0
-24114 0
-24115 0

c Transitions for k = 350
c i = 1
c  -2+1 --> -1
c    ( b^{350, 1}_2 ∧  b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧  p_350) -> ( b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0)
c  in CNF:
c    -b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨  b^{350, 2}_2
c    -b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_1
c    -b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨  b^{350, 2}_0
c  in DIMACS:
-24113 -24114  24115 -350  24116 0
-24113 -24114  24115 -350 -24117 0
-24113 -24114  24115 -350  24118 0

c  -1+1 --> 0
c    ( b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧  b^{350, 1}_0 ∧  p_350) -> (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧ -b^{350, 2}_0)
c  in CNF:
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_2
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_1
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_0
c  in DIMACS:
-24113  24114 -24115 -350 -24116 0
-24113  24114 -24115 -350 -24117 0
-24113  24114 -24115 -350 -24118 0

c  0+1 --> 1
c    (-b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧  p_350) -> (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0)
c  in CNF:
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_2
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_1
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨  b^{350, 2}_0
c  in DIMACS:
 24113  24114  24115 -350 -24116 0
 24113  24114  24115 -350 -24117 0
 24113  24114  24115 -350  24118 0

c  1+1 --> 2
c    (-b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧  b^{350, 1}_0 ∧  p_350) -> (-b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0)
c  in CNF:
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_2
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨  b^{350, 2}_1
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ -p_350 ∨ -b^{350, 2}_0
c  in DIMACS:
 24113  24114 -24115 -350 -24116 0
 24113  24114 -24115 -350  24117 0
 24113  24114 -24115 -350 -24118 0

c  2+1 --> break 
c    (-b^{350, 1}_2 ∧  b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧  p_350) -> break
c  in CNF:
c     b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ -p_350 ∨ break
c  in DIMACS:
 24113 -24114  24115 -350 1162 0


c  2-1 --> 1
c    (-b^{350, 1}_2 ∧  b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧ -p_350) -> (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0)
c  in CNF:
c     b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_2
c     b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_1
c     b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨  b^{350, 2}_0
c  in DIMACS:
 24113 -24114  24115  350 -24116 0
 24113 -24114  24115  350 -24117 0
 24113 -24114  24115  350  24118 0

c  1-1 --> 0
c    (-b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧  b^{350, 1}_0 ∧ -p_350) -> (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧ -b^{350, 2}_0)
c  in CNF:
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_2
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_1
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_0
c  in DIMACS:
 24113  24114 -24115  350 -24116 0
 24113  24114 -24115  350 -24117 0
 24113  24114 -24115  350 -24118 0

c  0-1 --> -1
c    (-b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧ -p_350) -> ( b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0)
c  in CNF:
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨  b^{350, 2}_2
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_1
c     b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨  b^{350, 2}_0
c  in DIMACS:
 24113  24114  24115  350  24116 0
 24113  24114  24115  350 -24117 0
 24113  24114  24115  350  24118 0

c  -1-1 --> -2
c    ( b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧  b^{350, 1}_0 ∧ -p_350) -> ( b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0)
c  in CNF:
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨  b^{350, 2}_2
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨  b^{350, 2}_1
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨  p_350 ∨ -b^{350, 2}_0
c  in DIMACS:
-24113  24114 -24115  350  24116 0
-24113  24114 -24115  350  24117 0
-24113  24114 -24115  350 -24118 0

c  -2-1 --> break 
c    ( b^{350, 1}_2 ∧  b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧ -p_350) -> break
c  in CNF:
c    -b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨  b^{350, 1}_0 ∨  p_350 ∨ break
c  in DIMACS:
-24113 -24114  24115  350 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{350, 1}_2 ∧ -b^{350, 1}_1 ∧ -b^{350, 1}_0 ∧ true) 
c  in CNF:
c    -b^{350, 1}_2 ∨  b^{350, 1}_1 ∨  b^{350, 1}_0 ∨ false 
c  in DIMACS:
-24113  24114  24115  0

c  3 does not represent an automaton state.
c    -(-b^{350, 1}_2 ∧  b^{350, 1}_1 ∧  b^{350, 1}_0 ∧ true) 
c  in CNF:
c     b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ false 
c  in DIMACS:
 24113 -24114 -24115  0
c  -3 does not represent an automaton state.
c    -( b^{350, 1}_2 ∧  b^{350, 1}_1 ∧  b^{350, 1}_0 ∧ true) 
c  in CNF:
c    -b^{350, 1}_2 ∨ -b^{350, 1}_1 ∨ -b^{350, 1}_0 ∨ false 
c  in DIMACS:
-24113 -24114 -24115  0

c i = 2
c  -2+1 --> -1
c    ( b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧  p_700) -> ( b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0)
c  in CNF:
c    -b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨  b^{350, 3}_2
c    -b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_1
c    -b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨  b^{350, 3}_0
c  in DIMACS:
-24116 -24117  24118 -700  24119 0
-24116 -24117  24118 -700 -24120 0
-24116 -24117  24118 -700  24121 0

c  -1+1 --> 0
c    ( b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0 ∧  p_700) -> (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧ -b^{350, 3}_0)
c  in CNF:
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_2
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_1
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_0
c  in DIMACS:
-24116  24117 -24118 -700 -24119 0
-24116  24117 -24118 -700 -24120 0
-24116  24117 -24118 -700 -24121 0

c  0+1 --> 1
c    (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧  p_700) -> (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0)
c  in CNF:
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_2
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_1
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨  b^{350, 3}_0
c  in DIMACS:
 24116  24117  24118 -700 -24119 0
 24116  24117  24118 -700 -24120 0
 24116  24117  24118 -700  24121 0

c  1+1 --> 2
c    (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0 ∧  p_700) -> (-b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0)
c  in CNF:
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_2
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨  b^{350, 3}_1
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ -p_700 ∨ -b^{350, 3}_0
c  in DIMACS:
 24116  24117 -24118 -700 -24119 0
 24116  24117 -24118 -700  24120 0
 24116  24117 -24118 -700 -24121 0

c  2+1 --> break 
c    (-b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧  p_700) -> break
c  in CNF:
c     b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ -p_700 ∨ break
c  in DIMACS:
 24116 -24117  24118 -700 1162 0


c  2-1 --> 1
c    (-b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧ -p_700) -> (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0)
c  in CNF:
c     b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_2
c     b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_1
c     b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨  b^{350, 3}_0
c  in DIMACS:
 24116 -24117  24118  700 -24119 0
 24116 -24117  24118  700 -24120 0
 24116 -24117  24118  700  24121 0

c  1-1 --> 0
c    (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0 ∧ -p_700) -> (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧ -b^{350, 3}_0)
c  in CNF:
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_2
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_1
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_0
c  in DIMACS:
 24116  24117 -24118  700 -24119 0
 24116  24117 -24118  700 -24120 0
 24116  24117 -24118  700 -24121 0

c  0-1 --> -1
c    (-b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧ -p_700) -> ( b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0)
c  in CNF:
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨  b^{350, 3}_2
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_1
c     b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨  b^{350, 3}_0
c  in DIMACS:
 24116  24117  24118  700  24119 0
 24116  24117  24118  700 -24120 0
 24116  24117  24118  700  24121 0

c  -1-1 --> -2
c    ( b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧  b^{350, 2}_0 ∧ -p_700) -> ( b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0)
c  in CNF:
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨  b^{350, 3}_2
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨  b^{350, 3}_1
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨  p_700 ∨ -b^{350, 3}_0
c  in DIMACS:
-24116  24117 -24118  700  24119 0
-24116  24117 -24118  700  24120 0
-24116  24117 -24118  700 -24121 0

c  -2-1 --> break 
c    ( b^{350, 2}_2 ∧  b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧ -p_700) -> break
c  in CNF:
c    -b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨  b^{350, 2}_0 ∨  p_700 ∨ break
c  in DIMACS:
-24116 -24117  24118  700 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{350, 2}_2 ∧ -b^{350, 2}_1 ∧ -b^{350, 2}_0 ∧ true) 
c  in CNF:
c    -b^{350, 2}_2 ∨  b^{350, 2}_1 ∨  b^{350, 2}_0 ∨ false 
c  in DIMACS:
-24116  24117  24118  0

c  3 does not represent an automaton state.
c    -(-b^{350, 2}_2 ∧  b^{350, 2}_1 ∧  b^{350, 2}_0 ∧ true) 
c  in CNF:
c     b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ false 
c  in DIMACS:
 24116 -24117 -24118  0
c  -3 does not represent an automaton state.
c    -( b^{350, 2}_2 ∧  b^{350, 2}_1 ∧  b^{350, 2}_0 ∧ true) 
c  in CNF:
c    -b^{350, 2}_2 ∨ -b^{350, 2}_1 ∨ -b^{350, 2}_0 ∨ false 
c  in DIMACS:
-24116 -24117 -24118  0

c i = 3
c  -2+1 --> -1
c    ( b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧  p_1050) -> ( b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧  b^{350, 4}_0)
c  in CNF:
c    -b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨  b^{350, 4}_2
c    -b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_1
c    -b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨  b^{350, 4}_0
c  in DIMACS:
-24119 -24120  24121 -1050  24122 0
-24119 -24120  24121 -1050 -24123 0
-24119 -24120  24121 -1050  24124 0

c  -1+1 --> 0
c    ( b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0 ∧  p_1050) -> (-b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧ -b^{350, 4}_0)
c  in CNF:
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_2
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_1
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_0
c  in DIMACS:
-24119  24120 -24121 -1050 -24122 0
-24119  24120 -24121 -1050 -24123 0
-24119  24120 -24121 -1050 -24124 0

c  0+1 --> 1
c    (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧  p_1050) -> (-b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧  b^{350, 4}_0)
c  in CNF:
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_2
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_1
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨  b^{350, 4}_0
c  in DIMACS:
 24119  24120  24121 -1050 -24122 0
 24119  24120  24121 -1050 -24123 0
 24119  24120  24121 -1050  24124 0

c  1+1 --> 2
c    (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0 ∧  p_1050) -> (-b^{350, 4}_2 ∧  b^{350, 4}_1 ∧ -b^{350, 4}_0)
c  in CNF:
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_2
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨  b^{350, 4}_1
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ -p_1050 ∨ -b^{350, 4}_0
c  in DIMACS:
 24119  24120 -24121 -1050 -24122 0
 24119  24120 -24121 -1050  24123 0
 24119  24120 -24121 -1050 -24124 0

c  2+1 --> break 
c    (-b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧  p_1050) -> break
c  in CNF:
c     b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ -p_1050 ∨ break
c  in DIMACS:
 24119 -24120  24121 -1050 1162 0


c  2-1 --> 1
c    (-b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧ -p_1050) -> (-b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧  b^{350, 4}_0)
c  in CNF:
c     b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_2
c     b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_1
c     b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨  b^{350, 4}_0
c  in DIMACS:
 24119 -24120  24121  1050 -24122 0
 24119 -24120  24121  1050 -24123 0
 24119 -24120  24121  1050  24124 0

c  1-1 --> 0
c    (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0 ∧ -p_1050) -> (-b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧ -b^{350, 4}_0)
c  in CNF:
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_2
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_1
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_0
c  in DIMACS:
 24119  24120 -24121  1050 -24122 0
 24119  24120 -24121  1050 -24123 0
 24119  24120 -24121  1050 -24124 0

c  0-1 --> -1
c    (-b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧ -p_1050) -> ( b^{350, 4}_2 ∧ -b^{350, 4}_1 ∧  b^{350, 4}_0)
c  in CNF:
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨  b^{350, 4}_2
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_1
c     b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨  b^{350, 4}_0
c  in DIMACS:
 24119  24120  24121  1050  24122 0
 24119  24120  24121  1050 -24123 0
 24119  24120  24121  1050  24124 0

c  -1-1 --> -2
c    ( b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧  b^{350, 3}_0 ∧ -p_1050) -> ( b^{350, 4}_2 ∧  b^{350, 4}_1 ∧ -b^{350, 4}_0)
c  in CNF:
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨  b^{350, 4}_2
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨  b^{350, 4}_1
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨  p_1050 ∨ -b^{350, 4}_0
c  in DIMACS:
-24119  24120 -24121  1050  24122 0
-24119  24120 -24121  1050  24123 0
-24119  24120 -24121  1050 -24124 0

c  -2-1 --> break 
c    ( b^{350, 3}_2 ∧  b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧ -p_1050) -> break
c  in CNF:
c    -b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨  b^{350, 3}_0 ∨  p_1050 ∨ break
c  in DIMACS:
-24119 -24120  24121  1050 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{350, 3}_2 ∧ -b^{350, 3}_1 ∧ -b^{350, 3}_0 ∧ true) 
c  in CNF:
c    -b^{350, 3}_2 ∨  b^{350, 3}_1 ∨  b^{350, 3}_0 ∨ false 
c  in DIMACS:
-24119  24120  24121  0

c  3 does not represent an automaton state.
c    -(-b^{350, 3}_2 ∧  b^{350, 3}_1 ∧  b^{350, 3}_0 ∧ true) 
c  in CNF:
c     b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ false 
c  in DIMACS:
 24119 -24120 -24121  0
c  -3 does not represent an automaton state.
c    -( b^{350, 3}_2 ∧  b^{350, 3}_1 ∧  b^{350, 3}_0 ∧ true) 
c  in CNF:
c    -b^{350, 3}_2 ∨ -b^{350, 3}_1 ∨ -b^{350, 3}_0 ∨ false 
c  in DIMACS:
-24119 -24120 -24121  0

c INIT for k = 351
c    -b^{351, 1}_2
c    -b^{351, 1}_1
c    -b^{351, 1}_0
c  in DIMACS:
-24125 0
-24126 0
-24127 0

c Transitions for k = 351
c i = 1
c  -2+1 --> -1
c    ( b^{351, 1}_2 ∧  b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧  p_351) -> ( b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0)
c  in CNF:
c    -b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨  b^{351, 2}_2
c    -b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_1
c    -b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨  b^{351, 2}_0
c  in DIMACS:
-24125 -24126  24127 -351  24128 0
-24125 -24126  24127 -351 -24129 0
-24125 -24126  24127 -351  24130 0

c  -1+1 --> 0
c    ( b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧  b^{351, 1}_0 ∧  p_351) -> (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧ -b^{351, 2}_0)
c  in CNF:
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_2
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_1
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_0
c  in DIMACS:
-24125  24126 -24127 -351 -24128 0
-24125  24126 -24127 -351 -24129 0
-24125  24126 -24127 -351 -24130 0

c  0+1 --> 1
c    (-b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧  p_351) -> (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0)
c  in CNF:
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_2
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_1
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨  b^{351, 2}_0
c  in DIMACS:
 24125  24126  24127 -351 -24128 0
 24125  24126  24127 -351 -24129 0
 24125  24126  24127 -351  24130 0

c  1+1 --> 2
c    (-b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧  b^{351, 1}_0 ∧  p_351) -> (-b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0)
c  in CNF:
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_2
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨  b^{351, 2}_1
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ -p_351 ∨ -b^{351, 2}_0
c  in DIMACS:
 24125  24126 -24127 -351 -24128 0
 24125  24126 -24127 -351  24129 0
 24125  24126 -24127 -351 -24130 0

c  2+1 --> break 
c    (-b^{351, 1}_2 ∧  b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧  p_351) -> break
c  in CNF:
c     b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ -p_351 ∨ break
c  in DIMACS:
 24125 -24126  24127 -351 1162 0


c  2-1 --> 1
c    (-b^{351, 1}_2 ∧  b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧ -p_351) -> (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0)
c  in CNF:
c     b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_2
c     b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_1
c     b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨  b^{351, 2}_0
c  in DIMACS:
 24125 -24126  24127  351 -24128 0
 24125 -24126  24127  351 -24129 0
 24125 -24126  24127  351  24130 0

c  1-1 --> 0
c    (-b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧  b^{351, 1}_0 ∧ -p_351) -> (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧ -b^{351, 2}_0)
c  in CNF:
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_2
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_1
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_0
c  in DIMACS:
 24125  24126 -24127  351 -24128 0
 24125  24126 -24127  351 -24129 0
 24125  24126 -24127  351 -24130 0

c  0-1 --> -1
c    (-b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧ -p_351) -> ( b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0)
c  in CNF:
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨  b^{351, 2}_2
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_1
c     b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨  b^{351, 2}_0
c  in DIMACS:
 24125  24126  24127  351  24128 0
 24125  24126  24127  351 -24129 0
 24125  24126  24127  351  24130 0

c  -1-1 --> -2
c    ( b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧  b^{351, 1}_0 ∧ -p_351) -> ( b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0)
c  in CNF:
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨  b^{351, 2}_2
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨  b^{351, 2}_1
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨  p_351 ∨ -b^{351, 2}_0
c  in DIMACS:
-24125  24126 -24127  351  24128 0
-24125  24126 -24127  351  24129 0
-24125  24126 -24127  351 -24130 0

c  -2-1 --> break 
c    ( b^{351, 1}_2 ∧  b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧ -p_351) -> break
c  in CNF:
c    -b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨  b^{351, 1}_0 ∨  p_351 ∨ break
c  in DIMACS:
-24125 -24126  24127  351 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{351, 1}_2 ∧ -b^{351, 1}_1 ∧ -b^{351, 1}_0 ∧ true) 
c  in CNF:
c    -b^{351, 1}_2 ∨  b^{351, 1}_1 ∨  b^{351, 1}_0 ∨ false 
c  in DIMACS:
-24125  24126  24127  0

c  3 does not represent an automaton state.
c    -(-b^{351, 1}_2 ∧  b^{351, 1}_1 ∧  b^{351, 1}_0 ∧ true) 
c  in CNF:
c     b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ false 
c  in DIMACS:
 24125 -24126 -24127  0
c  -3 does not represent an automaton state.
c    -( b^{351, 1}_2 ∧  b^{351, 1}_1 ∧  b^{351, 1}_0 ∧ true) 
c  in CNF:
c    -b^{351, 1}_2 ∨ -b^{351, 1}_1 ∨ -b^{351, 1}_0 ∨ false 
c  in DIMACS:
-24125 -24126 -24127  0

c i = 2
c  -2+1 --> -1
c    ( b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧  p_702) -> ( b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0)
c  in CNF:
c    -b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨  b^{351, 3}_2
c    -b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_1
c    -b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨  b^{351, 3}_0
c  in DIMACS:
-24128 -24129  24130 -702  24131 0
-24128 -24129  24130 -702 -24132 0
-24128 -24129  24130 -702  24133 0

c  -1+1 --> 0
c    ( b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0 ∧  p_702) -> (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧ -b^{351, 3}_0)
c  in CNF:
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_2
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_1
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_0
c  in DIMACS:
-24128  24129 -24130 -702 -24131 0
-24128  24129 -24130 -702 -24132 0
-24128  24129 -24130 -702 -24133 0

c  0+1 --> 1
c    (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧  p_702) -> (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0)
c  in CNF:
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_2
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_1
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨  b^{351, 3}_0
c  in DIMACS:
 24128  24129  24130 -702 -24131 0
 24128  24129  24130 -702 -24132 0
 24128  24129  24130 -702  24133 0

c  1+1 --> 2
c    (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0 ∧  p_702) -> (-b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0)
c  in CNF:
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_2
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨  b^{351, 3}_1
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ -p_702 ∨ -b^{351, 3}_0
c  in DIMACS:
 24128  24129 -24130 -702 -24131 0
 24128  24129 -24130 -702  24132 0
 24128  24129 -24130 -702 -24133 0

c  2+1 --> break 
c    (-b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧  p_702) -> break
c  in CNF:
c     b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ -p_702 ∨ break
c  in DIMACS:
 24128 -24129  24130 -702 1162 0


c  2-1 --> 1
c    (-b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧ -p_702) -> (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0)
c  in CNF:
c     b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_2
c     b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_1
c     b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨  b^{351, 3}_0
c  in DIMACS:
 24128 -24129  24130  702 -24131 0
 24128 -24129  24130  702 -24132 0
 24128 -24129  24130  702  24133 0

c  1-1 --> 0
c    (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0 ∧ -p_702) -> (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧ -b^{351, 3}_0)
c  in CNF:
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_2
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_1
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_0
c  in DIMACS:
 24128  24129 -24130  702 -24131 0
 24128  24129 -24130  702 -24132 0
 24128  24129 -24130  702 -24133 0

c  0-1 --> -1
c    (-b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧ -p_702) -> ( b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0)
c  in CNF:
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨  b^{351, 3}_2
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_1
c     b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨  b^{351, 3}_0
c  in DIMACS:
 24128  24129  24130  702  24131 0
 24128  24129  24130  702 -24132 0
 24128  24129  24130  702  24133 0

c  -1-1 --> -2
c    ( b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧  b^{351, 2}_0 ∧ -p_702) -> ( b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0)
c  in CNF:
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨  b^{351, 3}_2
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨  b^{351, 3}_1
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨  p_702 ∨ -b^{351, 3}_0
c  in DIMACS:
-24128  24129 -24130  702  24131 0
-24128  24129 -24130  702  24132 0
-24128  24129 -24130  702 -24133 0

c  -2-1 --> break 
c    ( b^{351, 2}_2 ∧  b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧ -p_702) -> break
c  in CNF:
c    -b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨  b^{351, 2}_0 ∨  p_702 ∨ break
c  in DIMACS:
-24128 -24129  24130  702 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{351, 2}_2 ∧ -b^{351, 2}_1 ∧ -b^{351, 2}_0 ∧ true) 
c  in CNF:
c    -b^{351, 2}_2 ∨  b^{351, 2}_1 ∨  b^{351, 2}_0 ∨ false 
c  in DIMACS:
-24128  24129  24130  0

c  3 does not represent an automaton state.
c    -(-b^{351, 2}_2 ∧  b^{351, 2}_1 ∧  b^{351, 2}_0 ∧ true) 
c  in CNF:
c     b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ false 
c  in DIMACS:
 24128 -24129 -24130  0
c  -3 does not represent an automaton state.
c    -( b^{351, 2}_2 ∧  b^{351, 2}_1 ∧  b^{351, 2}_0 ∧ true) 
c  in CNF:
c    -b^{351, 2}_2 ∨ -b^{351, 2}_1 ∨ -b^{351, 2}_0 ∨ false 
c  in DIMACS:
-24128 -24129 -24130  0

c i = 3
c  -2+1 --> -1
c    ( b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧  p_1053) -> ( b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧  b^{351, 4}_0)
c  in CNF:
c    -b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨  b^{351, 4}_2
c    -b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_1
c    -b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨  b^{351, 4}_0
c  in DIMACS:
-24131 -24132  24133 -1053  24134 0
-24131 -24132  24133 -1053 -24135 0
-24131 -24132  24133 -1053  24136 0

c  -1+1 --> 0
c    ( b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0 ∧  p_1053) -> (-b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧ -b^{351, 4}_0)
c  in CNF:
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_2
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_1
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_0
c  in DIMACS:
-24131  24132 -24133 -1053 -24134 0
-24131  24132 -24133 -1053 -24135 0
-24131  24132 -24133 -1053 -24136 0

c  0+1 --> 1
c    (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧  p_1053) -> (-b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧  b^{351, 4}_0)
c  in CNF:
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_2
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_1
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨  b^{351, 4}_0
c  in DIMACS:
 24131  24132  24133 -1053 -24134 0
 24131  24132  24133 -1053 -24135 0
 24131  24132  24133 -1053  24136 0

c  1+1 --> 2
c    (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0 ∧  p_1053) -> (-b^{351, 4}_2 ∧  b^{351, 4}_1 ∧ -b^{351, 4}_0)
c  in CNF:
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_2
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨  b^{351, 4}_1
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ -p_1053 ∨ -b^{351, 4}_0
c  in DIMACS:
 24131  24132 -24133 -1053 -24134 0
 24131  24132 -24133 -1053  24135 0
 24131  24132 -24133 -1053 -24136 0

c  2+1 --> break 
c    (-b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧  p_1053) -> break
c  in CNF:
c     b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ -p_1053 ∨ break
c  in DIMACS:
 24131 -24132  24133 -1053 1162 0


c  2-1 --> 1
c    (-b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧ -p_1053) -> (-b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧  b^{351, 4}_0)
c  in CNF:
c     b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_2
c     b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_1
c     b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨  b^{351, 4}_0
c  in DIMACS:
 24131 -24132  24133  1053 -24134 0
 24131 -24132  24133  1053 -24135 0
 24131 -24132  24133  1053  24136 0

c  1-1 --> 0
c    (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0 ∧ -p_1053) -> (-b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧ -b^{351, 4}_0)
c  in CNF:
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_2
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_1
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_0
c  in DIMACS:
 24131  24132 -24133  1053 -24134 0
 24131  24132 -24133  1053 -24135 0
 24131  24132 -24133  1053 -24136 0

c  0-1 --> -1
c    (-b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧ -p_1053) -> ( b^{351, 4}_2 ∧ -b^{351, 4}_1 ∧  b^{351, 4}_0)
c  in CNF:
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨  b^{351, 4}_2
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_1
c     b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨  b^{351, 4}_0
c  in DIMACS:
 24131  24132  24133  1053  24134 0
 24131  24132  24133  1053 -24135 0
 24131  24132  24133  1053  24136 0

c  -1-1 --> -2
c    ( b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧  b^{351, 3}_0 ∧ -p_1053) -> ( b^{351, 4}_2 ∧  b^{351, 4}_1 ∧ -b^{351, 4}_0)
c  in CNF:
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨  b^{351, 4}_2
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨  b^{351, 4}_1
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨  p_1053 ∨ -b^{351, 4}_0
c  in DIMACS:
-24131  24132 -24133  1053  24134 0
-24131  24132 -24133  1053  24135 0
-24131  24132 -24133  1053 -24136 0

c  -2-1 --> break 
c    ( b^{351, 3}_2 ∧  b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧ -p_1053) -> break
c  in CNF:
c    -b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨  b^{351, 3}_0 ∨  p_1053 ∨ break
c  in DIMACS:
-24131 -24132  24133  1053 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{351, 3}_2 ∧ -b^{351, 3}_1 ∧ -b^{351, 3}_0 ∧ true) 
c  in CNF:
c    -b^{351, 3}_2 ∨  b^{351, 3}_1 ∨  b^{351, 3}_0 ∨ false 
c  in DIMACS:
-24131  24132  24133  0

c  3 does not represent an automaton state.
c    -(-b^{351, 3}_2 ∧  b^{351, 3}_1 ∧  b^{351, 3}_0 ∧ true) 
c  in CNF:
c     b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ false 
c  in DIMACS:
 24131 -24132 -24133  0
c  -3 does not represent an automaton state.
c    -( b^{351, 3}_2 ∧  b^{351, 3}_1 ∧  b^{351, 3}_0 ∧ true) 
c  in CNF:
c    -b^{351, 3}_2 ∨ -b^{351, 3}_1 ∨ -b^{351, 3}_0 ∨ false 
c  in DIMACS:
-24131 -24132 -24133  0

c INIT for k = 352
c    -b^{352, 1}_2
c    -b^{352, 1}_1
c    -b^{352, 1}_0
c  in DIMACS:
-24137 0
-24138 0
-24139 0

c Transitions for k = 352
c i = 1
c  -2+1 --> -1
c    ( b^{352, 1}_2 ∧  b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧  p_352) -> ( b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0)
c  in CNF:
c    -b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨  b^{352, 2}_2
c    -b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_1
c    -b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨  b^{352, 2}_0
c  in DIMACS:
-24137 -24138  24139 -352  24140 0
-24137 -24138  24139 -352 -24141 0
-24137 -24138  24139 -352  24142 0

c  -1+1 --> 0
c    ( b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧  b^{352, 1}_0 ∧  p_352) -> (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧ -b^{352, 2}_0)
c  in CNF:
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_2
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_1
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_0
c  in DIMACS:
-24137  24138 -24139 -352 -24140 0
-24137  24138 -24139 -352 -24141 0
-24137  24138 -24139 -352 -24142 0

c  0+1 --> 1
c    (-b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧  p_352) -> (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0)
c  in CNF:
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_2
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_1
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨  b^{352, 2}_0
c  in DIMACS:
 24137  24138  24139 -352 -24140 0
 24137  24138  24139 -352 -24141 0
 24137  24138  24139 -352  24142 0

c  1+1 --> 2
c    (-b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧  b^{352, 1}_0 ∧  p_352) -> (-b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0)
c  in CNF:
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_2
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨  b^{352, 2}_1
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ -p_352 ∨ -b^{352, 2}_0
c  in DIMACS:
 24137  24138 -24139 -352 -24140 0
 24137  24138 -24139 -352  24141 0
 24137  24138 -24139 -352 -24142 0

c  2+1 --> break 
c    (-b^{352, 1}_2 ∧  b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧  p_352) -> break
c  in CNF:
c     b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ -p_352 ∨ break
c  in DIMACS:
 24137 -24138  24139 -352 1162 0


c  2-1 --> 1
c    (-b^{352, 1}_2 ∧  b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧ -p_352) -> (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0)
c  in CNF:
c     b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_2
c     b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_1
c     b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨  b^{352, 2}_0
c  in DIMACS:
 24137 -24138  24139  352 -24140 0
 24137 -24138  24139  352 -24141 0
 24137 -24138  24139  352  24142 0

c  1-1 --> 0
c    (-b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧  b^{352, 1}_0 ∧ -p_352) -> (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧ -b^{352, 2}_0)
c  in CNF:
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_2
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_1
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_0
c  in DIMACS:
 24137  24138 -24139  352 -24140 0
 24137  24138 -24139  352 -24141 0
 24137  24138 -24139  352 -24142 0

c  0-1 --> -1
c    (-b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧ -p_352) -> ( b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0)
c  in CNF:
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨  b^{352, 2}_2
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_1
c     b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨  b^{352, 2}_0
c  in DIMACS:
 24137  24138  24139  352  24140 0
 24137  24138  24139  352 -24141 0
 24137  24138  24139  352  24142 0

c  -1-1 --> -2
c    ( b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧  b^{352, 1}_0 ∧ -p_352) -> ( b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0)
c  in CNF:
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨  b^{352, 2}_2
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨  b^{352, 2}_1
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨  p_352 ∨ -b^{352, 2}_0
c  in DIMACS:
-24137  24138 -24139  352  24140 0
-24137  24138 -24139  352  24141 0
-24137  24138 -24139  352 -24142 0

c  -2-1 --> break 
c    ( b^{352, 1}_2 ∧  b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧ -p_352) -> break
c  in CNF:
c    -b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨  b^{352, 1}_0 ∨  p_352 ∨ break
c  in DIMACS:
-24137 -24138  24139  352 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{352, 1}_2 ∧ -b^{352, 1}_1 ∧ -b^{352, 1}_0 ∧ true) 
c  in CNF:
c    -b^{352, 1}_2 ∨  b^{352, 1}_1 ∨  b^{352, 1}_0 ∨ false 
c  in DIMACS:
-24137  24138  24139  0

c  3 does not represent an automaton state.
c    -(-b^{352, 1}_2 ∧  b^{352, 1}_1 ∧  b^{352, 1}_0 ∧ true) 
c  in CNF:
c     b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ false 
c  in DIMACS:
 24137 -24138 -24139  0
c  -3 does not represent an automaton state.
c    -( b^{352, 1}_2 ∧  b^{352, 1}_1 ∧  b^{352, 1}_0 ∧ true) 
c  in CNF:
c    -b^{352, 1}_2 ∨ -b^{352, 1}_1 ∨ -b^{352, 1}_0 ∨ false 
c  in DIMACS:
-24137 -24138 -24139  0

c i = 2
c  -2+1 --> -1
c    ( b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧  p_704) -> ( b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0)
c  in CNF:
c    -b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨  b^{352, 3}_2
c    -b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_1
c    -b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨  b^{352, 3}_0
c  in DIMACS:
-24140 -24141  24142 -704  24143 0
-24140 -24141  24142 -704 -24144 0
-24140 -24141  24142 -704  24145 0

c  -1+1 --> 0
c    ( b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0 ∧  p_704) -> (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧ -b^{352, 3}_0)
c  in CNF:
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_2
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_1
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_0
c  in DIMACS:
-24140  24141 -24142 -704 -24143 0
-24140  24141 -24142 -704 -24144 0
-24140  24141 -24142 -704 -24145 0

c  0+1 --> 1
c    (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧  p_704) -> (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0)
c  in CNF:
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_2
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_1
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨  b^{352, 3}_0
c  in DIMACS:
 24140  24141  24142 -704 -24143 0
 24140  24141  24142 -704 -24144 0
 24140  24141  24142 -704  24145 0

c  1+1 --> 2
c    (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0 ∧  p_704) -> (-b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0)
c  in CNF:
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_2
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨  b^{352, 3}_1
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ -p_704 ∨ -b^{352, 3}_0
c  in DIMACS:
 24140  24141 -24142 -704 -24143 0
 24140  24141 -24142 -704  24144 0
 24140  24141 -24142 -704 -24145 0

c  2+1 --> break 
c    (-b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧  p_704) -> break
c  in CNF:
c     b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ -p_704 ∨ break
c  in DIMACS:
 24140 -24141  24142 -704 1162 0


c  2-1 --> 1
c    (-b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧ -p_704) -> (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0)
c  in CNF:
c     b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_2
c     b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_1
c     b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨  b^{352, 3}_0
c  in DIMACS:
 24140 -24141  24142  704 -24143 0
 24140 -24141  24142  704 -24144 0
 24140 -24141  24142  704  24145 0

c  1-1 --> 0
c    (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0 ∧ -p_704) -> (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧ -b^{352, 3}_0)
c  in CNF:
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_2
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_1
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_0
c  in DIMACS:
 24140  24141 -24142  704 -24143 0
 24140  24141 -24142  704 -24144 0
 24140  24141 -24142  704 -24145 0

c  0-1 --> -1
c    (-b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧ -p_704) -> ( b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0)
c  in CNF:
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨  b^{352, 3}_2
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_1
c     b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨  b^{352, 3}_0
c  in DIMACS:
 24140  24141  24142  704  24143 0
 24140  24141  24142  704 -24144 0
 24140  24141  24142  704  24145 0

c  -1-1 --> -2
c    ( b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧  b^{352, 2}_0 ∧ -p_704) -> ( b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0)
c  in CNF:
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨  b^{352, 3}_2
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨  b^{352, 3}_1
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨  p_704 ∨ -b^{352, 3}_0
c  in DIMACS:
-24140  24141 -24142  704  24143 0
-24140  24141 -24142  704  24144 0
-24140  24141 -24142  704 -24145 0

c  -2-1 --> break 
c    ( b^{352, 2}_2 ∧  b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧ -p_704) -> break
c  in CNF:
c    -b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨  b^{352, 2}_0 ∨  p_704 ∨ break
c  in DIMACS:
-24140 -24141  24142  704 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{352, 2}_2 ∧ -b^{352, 2}_1 ∧ -b^{352, 2}_0 ∧ true) 
c  in CNF:
c    -b^{352, 2}_2 ∨  b^{352, 2}_1 ∨  b^{352, 2}_0 ∨ false 
c  in DIMACS:
-24140  24141  24142  0

c  3 does not represent an automaton state.
c    -(-b^{352, 2}_2 ∧  b^{352, 2}_1 ∧  b^{352, 2}_0 ∧ true) 
c  in CNF:
c     b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ false 
c  in DIMACS:
 24140 -24141 -24142  0
c  -3 does not represent an automaton state.
c    -( b^{352, 2}_2 ∧  b^{352, 2}_1 ∧  b^{352, 2}_0 ∧ true) 
c  in CNF:
c    -b^{352, 2}_2 ∨ -b^{352, 2}_1 ∨ -b^{352, 2}_0 ∨ false 
c  in DIMACS:
-24140 -24141 -24142  0

c i = 3
c  -2+1 --> -1
c    ( b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧  p_1056) -> ( b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧  b^{352, 4}_0)
c  in CNF:
c    -b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨  b^{352, 4}_2
c    -b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_1
c    -b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨  b^{352, 4}_0
c  in DIMACS:
-24143 -24144  24145 -1056  24146 0
-24143 -24144  24145 -1056 -24147 0
-24143 -24144  24145 -1056  24148 0

c  -1+1 --> 0
c    ( b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0 ∧  p_1056) -> (-b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧ -b^{352, 4}_0)
c  in CNF:
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_2
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_1
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_0
c  in DIMACS:
-24143  24144 -24145 -1056 -24146 0
-24143  24144 -24145 -1056 -24147 0
-24143  24144 -24145 -1056 -24148 0

c  0+1 --> 1
c    (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧  p_1056) -> (-b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧  b^{352, 4}_0)
c  in CNF:
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_2
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_1
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨  b^{352, 4}_0
c  in DIMACS:
 24143  24144  24145 -1056 -24146 0
 24143  24144  24145 -1056 -24147 0
 24143  24144  24145 -1056  24148 0

c  1+1 --> 2
c    (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0 ∧  p_1056) -> (-b^{352, 4}_2 ∧  b^{352, 4}_1 ∧ -b^{352, 4}_0)
c  in CNF:
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_2
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨  b^{352, 4}_1
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ -p_1056 ∨ -b^{352, 4}_0
c  in DIMACS:
 24143  24144 -24145 -1056 -24146 0
 24143  24144 -24145 -1056  24147 0
 24143  24144 -24145 -1056 -24148 0

c  2+1 --> break 
c    (-b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧  p_1056) -> break
c  in CNF:
c     b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ -p_1056 ∨ break
c  in DIMACS:
 24143 -24144  24145 -1056 1162 0


c  2-1 --> 1
c    (-b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧ -p_1056) -> (-b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧  b^{352, 4}_0)
c  in CNF:
c     b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_2
c     b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_1
c     b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨  b^{352, 4}_0
c  in DIMACS:
 24143 -24144  24145  1056 -24146 0
 24143 -24144  24145  1056 -24147 0
 24143 -24144  24145  1056  24148 0

c  1-1 --> 0
c    (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0 ∧ -p_1056) -> (-b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧ -b^{352, 4}_0)
c  in CNF:
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_2
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_1
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_0
c  in DIMACS:
 24143  24144 -24145  1056 -24146 0
 24143  24144 -24145  1056 -24147 0
 24143  24144 -24145  1056 -24148 0

c  0-1 --> -1
c    (-b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧ -p_1056) -> ( b^{352, 4}_2 ∧ -b^{352, 4}_1 ∧  b^{352, 4}_0)
c  in CNF:
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨  b^{352, 4}_2
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_1
c     b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨  b^{352, 4}_0
c  in DIMACS:
 24143  24144  24145  1056  24146 0
 24143  24144  24145  1056 -24147 0
 24143  24144  24145  1056  24148 0

c  -1-1 --> -2
c    ( b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧  b^{352, 3}_0 ∧ -p_1056) -> ( b^{352, 4}_2 ∧  b^{352, 4}_1 ∧ -b^{352, 4}_0)
c  in CNF:
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨  b^{352, 4}_2
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨  b^{352, 4}_1
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨  p_1056 ∨ -b^{352, 4}_0
c  in DIMACS:
-24143  24144 -24145  1056  24146 0
-24143  24144 -24145  1056  24147 0
-24143  24144 -24145  1056 -24148 0

c  -2-1 --> break 
c    ( b^{352, 3}_2 ∧  b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧ -p_1056) -> break
c  in CNF:
c    -b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨  b^{352, 3}_0 ∨  p_1056 ∨ break
c  in DIMACS:
-24143 -24144  24145  1056 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{352, 3}_2 ∧ -b^{352, 3}_1 ∧ -b^{352, 3}_0 ∧ true) 
c  in CNF:
c    -b^{352, 3}_2 ∨  b^{352, 3}_1 ∨  b^{352, 3}_0 ∨ false 
c  in DIMACS:
-24143  24144  24145  0

c  3 does not represent an automaton state.
c    -(-b^{352, 3}_2 ∧  b^{352, 3}_1 ∧  b^{352, 3}_0 ∧ true) 
c  in CNF:
c     b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ false 
c  in DIMACS:
 24143 -24144 -24145  0
c  -3 does not represent an automaton state.
c    -( b^{352, 3}_2 ∧  b^{352, 3}_1 ∧  b^{352, 3}_0 ∧ true) 
c  in CNF:
c    -b^{352, 3}_2 ∨ -b^{352, 3}_1 ∨ -b^{352, 3}_0 ∨ false 
c  in DIMACS:
-24143 -24144 -24145  0

c INIT for k = 353
c    -b^{353, 1}_2
c    -b^{353, 1}_1
c    -b^{353, 1}_0
c  in DIMACS:
-24149 0
-24150 0
-24151 0

c Transitions for k = 353
c i = 1
c  -2+1 --> -1
c    ( b^{353, 1}_2 ∧  b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧  p_353) -> ( b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0)
c  in CNF:
c    -b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨  b^{353, 2}_2
c    -b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_1
c    -b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨  b^{353, 2}_0
c  in DIMACS:
-24149 -24150  24151 -353  24152 0
-24149 -24150  24151 -353 -24153 0
-24149 -24150  24151 -353  24154 0

c  -1+1 --> 0
c    ( b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧  b^{353, 1}_0 ∧  p_353) -> (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧ -b^{353, 2}_0)
c  in CNF:
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_2
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_1
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_0
c  in DIMACS:
-24149  24150 -24151 -353 -24152 0
-24149  24150 -24151 -353 -24153 0
-24149  24150 -24151 -353 -24154 0

c  0+1 --> 1
c    (-b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧  p_353) -> (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0)
c  in CNF:
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_2
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_1
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨  b^{353, 2}_0
c  in DIMACS:
 24149  24150  24151 -353 -24152 0
 24149  24150  24151 -353 -24153 0
 24149  24150  24151 -353  24154 0

c  1+1 --> 2
c    (-b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧  b^{353, 1}_0 ∧  p_353) -> (-b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0)
c  in CNF:
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_2
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨  b^{353, 2}_1
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ -p_353 ∨ -b^{353, 2}_0
c  in DIMACS:
 24149  24150 -24151 -353 -24152 0
 24149  24150 -24151 -353  24153 0
 24149  24150 -24151 -353 -24154 0

c  2+1 --> break 
c    (-b^{353, 1}_2 ∧  b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧  p_353) -> break
c  in CNF:
c     b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ -p_353 ∨ break
c  in DIMACS:
 24149 -24150  24151 -353 1162 0


c  2-1 --> 1
c    (-b^{353, 1}_2 ∧  b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧ -p_353) -> (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0)
c  in CNF:
c     b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_2
c     b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_1
c     b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨  b^{353, 2}_0
c  in DIMACS:
 24149 -24150  24151  353 -24152 0
 24149 -24150  24151  353 -24153 0
 24149 -24150  24151  353  24154 0

c  1-1 --> 0
c    (-b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧  b^{353, 1}_0 ∧ -p_353) -> (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧ -b^{353, 2}_0)
c  in CNF:
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_2
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_1
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_0
c  in DIMACS:
 24149  24150 -24151  353 -24152 0
 24149  24150 -24151  353 -24153 0
 24149  24150 -24151  353 -24154 0

c  0-1 --> -1
c    (-b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧ -p_353) -> ( b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0)
c  in CNF:
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨  b^{353, 2}_2
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_1
c     b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨  b^{353, 2}_0
c  in DIMACS:
 24149  24150  24151  353  24152 0
 24149  24150  24151  353 -24153 0
 24149  24150  24151  353  24154 0

c  -1-1 --> -2
c    ( b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧  b^{353, 1}_0 ∧ -p_353) -> ( b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0)
c  in CNF:
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨  b^{353, 2}_2
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨  b^{353, 2}_1
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨  p_353 ∨ -b^{353, 2}_0
c  in DIMACS:
-24149  24150 -24151  353  24152 0
-24149  24150 -24151  353  24153 0
-24149  24150 -24151  353 -24154 0

c  -2-1 --> break 
c    ( b^{353, 1}_2 ∧  b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧ -p_353) -> break
c  in CNF:
c    -b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨  b^{353, 1}_0 ∨  p_353 ∨ break
c  in DIMACS:
-24149 -24150  24151  353 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{353, 1}_2 ∧ -b^{353, 1}_1 ∧ -b^{353, 1}_0 ∧ true) 
c  in CNF:
c    -b^{353, 1}_2 ∨  b^{353, 1}_1 ∨  b^{353, 1}_0 ∨ false 
c  in DIMACS:
-24149  24150  24151  0

c  3 does not represent an automaton state.
c    -(-b^{353, 1}_2 ∧  b^{353, 1}_1 ∧  b^{353, 1}_0 ∧ true) 
c  in CNF:
c     b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ false 
c  in DIMACS:
 24149 -24150 -24151  0
c  -3 does not represent an automaton state.
c    -( b^{353, 1}_2 ∧  b^{353, 1}_1 ∧  b^{353, 1}_0 ∧ true) 
c  in CNF:
c    -b^{353, 1}_2 ∨ -b^{353, 1}_1 ∨ -b^{353, 1}_0 ∨ false 
c  in DIMACS:
-24149 -24150 -24151  0

c i = 2
c  -2+1 --> -1
c    ( b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧  p_706) -> ( b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0)
c  in CNF:
c    -b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨  b^{353, 3}_2
c    -b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_1
c    -b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨  b^{353, 3}_0
c  in DIMACS:
-24152 -24153  24154 -706  24155 0
-24152 -24153  24154 -706 -24156 0
-24152 -24153  24154 -706  24157 0

c  -1+1 --> 0
c    ( b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0 ∧  p_706) -> (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧ -b^{353, 3}_0)
c  in CNF:
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_2
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_1
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_0
c  in DIMACS:
-24152  24153 -24154 -706 -24155 0
-24152  24153 -24154 -706 -24156 0
-24152  24153 -24154 -706 -24157 0

c  0+1 --> 1
c    (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧  p_706) -> (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0)
c  in CNF:
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_2
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_1
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨  b^{353, 3}_0
c  in DIMACS:
 24152  24153  24154 -706 -24155 0
 24152  24153  24154 -706 -24156 0
 24152  24153  24154 -706  24157 0

c  1+1 --> 2
c    (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0 ∧  p_706) -> (-b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0)
c  in CNF:
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_2
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨  b^{353, 3}_1
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ -p_706 ∨ -b^{353, 3}_0
c  in DIMACS:
 24152  24153 -24154 -706 -24155 0
 24152  24153 -24154 -706  24156 0
 24152  24153 -24154 -706 -24157 0

c  2+1 --> break 
c    (-b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧  p_706) -> break
c  in CNF:
c     b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ -p_706 ∨ break
c  in DIMACS:
 24152 -24153  24154 -706 1162 0


c  2-1 --> 1
c    (-b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧ -p_706) -> (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0)
c  in CNF:
c     b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_2
c     b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_1
c     b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨  b^{353, 3}_0
c  in DIMACS:
 24152 -24153  24154  706 -24155 0
 24152 -24153  24154  706 -24156 0
 24152 -24153  24154  706  24157 0

c  1-1 --> 0
c    (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0 ∧ -p_706) -> (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧ -b^{353, 3}_0)
c  in CNF:
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_2
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_1
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_0
c  in DIMACS:
 24152  24153 -24154  706 -24155 0
 24152  24153 -24154  706 -24156 0
 24152  24153 -24154  706 -24157 0

c  0-1 --> -1
c    (-b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧ -p_706) -> ( b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0)
c  in CNF:
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨  b^{353, 3}_2
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_1
c     b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨  b^{353, 3}_0
c  in DIMACS:
 24152  24153  24154  706  24155 0
 24152  24153  24154  706 -24156 0
 24152  24153  24154  706  24157 0

c  -1-1 --> -2
c    ( b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧  b^{353, 2}_0 ∧ -p_706) -> ( b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0)
c  in CNF:
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨  b^{353, 3}_2
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨  b^{353, 3}_1
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨  p_706 ∨ -b^{353, 3}_0
c  in DIMACS:
-24152  24153 -24154  706  24155 0
-24152  24153 -24154  706  24156 0
-24152  24153 -24154  706 -24157 0

c  -2-1 --> break 
c    ( b^{353, 2}_2 ∧  b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧ -p_706) -> break
c  in CNF:
c    -b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨  b^{353, 2}_0 ∨  p_706 ∨ break
c  in DIMACS:
-24152 -24153  24154  706 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{353, 2}_2 ∧ -b^{353, 2}_1 ∧ -b^{353, 2}_0 ∧ true) 
c  in CNF:
c    -b^{353, 2}_2 ∨  b^{353, 2}_1 ∨  b^{353, 2}_0 ∨ false 
c  in DIMACS:
-24152  24153  24154  0

c  3 does not represent an automaton state.
c    -(-b^{353, 2}_2 ∧  b^{353, 2}_1 ∧  b^{353, 2}_0 ∧ true) 
c  in CNF:
c     b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ false 
c  in DIMACS:
 24152 -24153 -24154  0
c  -3 does not represent an automaton state.
c    -( b^{353, 2}_2 ∧  b^{353, 2}_1 ∧  b^{353, 2}_0 ∧ true) 
c  in CNF:
c    -b^{353, 2}_2 ∨ -b^{353, 2}_1 ∨ -b^{353, 2}_0 ∨ false 
c  in DIMACS:
-24152 -24153 -24154  0

c i = 3
c  -2+1 --> -1
c    ( b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧  p_1059) -> ( b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧  b^{353, 4}_0)
c  in CNF:
c    -b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨  b^{353, 4}_2
c    -b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_1
c    -b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨  b^{353, 4}_0
c  in DIMACS:
-24155 -24156  24157 -1059  24158 0
-24155 -24156  24157 -1059 -24159 0
-24155 -24156  24157 -1059  24160 0

c  -1+1 --> 0
c    ( b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0 ∧  p_1059) -> (-b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧ -b^{353, 4}_0)
c  in CNF:
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_2
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_1
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_0
c  in DIMACS:
-24155  24156 -24157 -1059 -24158 0
-24155  24156 -24157 -1059 -24159 0
-24155  24156 -24157 -1059 -24160 0

c  0+1 --> 1
c    (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧  p_1059) -> (-b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧  b^{353, 4}_0)
c  in CNF:
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_2
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_1
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨  b^{353, 4}_0
c  in DIMACS:
 24155  24156  24157 -1059 -24158 0
 24155  24156  24157 -1059 -24159 0
 24155  24156  24157 -1059  24160 0

c  1+1 --> 2
c    (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0 ∧  p_1059) -> (-b^{353, 4}_2 ∧  b^{353, 4}_1 ∧ -b^{353, 4}_0)
c  in CNF:
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_2
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨  b^{353, 4}_1
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ -p_1059 ∨ -b^{353, 4}_0
c  in DIMACS:
 24155  24156 -24157 -1059 -24158 0
 24155  24156 -24157 -1059  24159 0
 24155  24156 -24157 -1059 -24160 0

c  2+1 --> break 
c    (-b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧  p_1059) -> break
c  in CNF:
c     b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ -p_1059 ∨ break
c  in DIMACS:
 24155 -24156  24157 -1059 1162 0


c  2-1 --> 1
c    (-b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧ -p_1059) -> (-b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧  b^{353, 4}_0)
c  in CNF:
c     b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_2
c     b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_1
c     b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨  b^{353, 4}_0
c  in DIMACS:
 24155 -24156  24157  1059 -24158 0
 24155 -24156  24157  1059 -24159 0
 24155 -24156  24157  1059  24160 0

c  1-1 --> 0
c    (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0 ∧ -p_1059) -> (-b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧ -b^{353, 4}_0)
c  in CNF:
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_2
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_1
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_0
c  in DIMACS:
 24155  24156 -24157  1059 -24158 0
 24155  24156 -24157  1059 -24159 0
 24155  24156 -24157  1059 -24160 0

c  0-1 --> -1
c    (-b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧ -p_1059) -> ( b^{353, 4}_2 ∧ -b^{353, 4}_1 ∧  b^{353, 4}_0)
c  in CNF:
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨  b^{353, 4}_2
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_1
c     b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨  b^{353, 4}_0
c  in DIMACS:
 24155  24156  24157  1059  24158 0
 24155  24156  24157  1059 -24159 0
 24155  24156  24157  1059  24160 0

c  -1-1 --> -2
c    ( b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧  b^{353, 3}_0 ∧ -p_1059) -> ( b^{353, 4}_2 ∧  b^{353, 4}_1 ∧ -b^{353, 4}_0)
c  in CNF:
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨  b^{353, 4}_2
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨  b^{353, 4}_1
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨  p_1059 ∨ -b^{353, 4}_0
c  in DIMACS:
-24155  24156 -24157  1059  24158 0
-24155  24156 -24157  1059  24159 0
-24155  24156 -24157  1059 -24160 0

c  -2-1 --> break 
c    ( b^{353, 3}_2 ∧  b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧ -p_1059) -> break
c  in CNF:
c    -b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨  b^{353, 3}_0 ∨  p_1059 ∨ break
c  in DIMACS:
-24155 -24156  24157  1059 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{353, 3}_2 ∧ -b^{353, 3}_1 ∧ -b^{353, 3}_0 ∧ true) 
c  in CNF:
c    -b^{353, 3}_2 ∨  b^{353, 3}_1 ∨  b^{353, 3}_0 ∨ false 
c  in DIMACS:
-24155  24156  24157  0

c  3 does not represent an automaton state.
c    -(-b^{353, 3}_2 ∧  b^{353, 3}_1 ∧  b^{353, 3}_0 ∧ true) 
c  in CNF:
c     b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ false 
c  in DIMACS:
 24155 -24156 -24157  0
c  -3 does not represent an automaton state.
c    -( b^{353, 3}_2 ∧  b^{353, 3}_1 ∧  b^{353, 3}_0 ∧ true) 
c  in CNF:
c    -b^{353, 3}_2 ∨ -b^{353, 3}_1 ∨ -b^{353, 3}_0 ∨ false 
c  in DIMACS:
-24155 -24156 -24157  0

c INIT for k = 354
c    -b^{354, 1}_2
c    -b^{354, 1}_1
c    -b^{354, 1}_0
c  in DIMACS:
-24161 0
-24162 0
-24163 0

c Transitions for k = 354
c i = 1
c  -2+1 --> -1
c    ( b^{354, 1}_2 ∧  b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧  p_354) -> ( b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0)
c  in CNF:
c    -b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨  b^{354, 2}_2
c    -b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_1
c    -b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨  b^{354, 2}_0
c  in DIMACS:
-24161 -24162  24163 -354  24164 0
-24161 -24162  24163 -354 -24165 0
-24161 -24162  24163 -354  24166 0

c  -1+1 --> 0
c    ( b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧  b^{354, 1}_0 ∧  p_354) -> (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧ -b^{354, 2}_0)
c  in CNF:
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_2
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_1
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_0
c  in DIMACS:
-24161  24162 -24163 -354 -24164 0
-24161  24162 -24163 -354 -24165 0
-24161  24162 -24163 -354 -24166 0

c  0+1 --> 1
c    (-b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧  p_354) -> (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0)
c  in CNF:
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_2
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_1
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨  b^{354, 2}_0
c  in DIMACS:
 24161  24162  24163 -354 -24164 0
 24161  24162  24163 -354 -24165 0
 24161  24162  24163 -354  24166 0

c  1+1 --> 2
c    (-b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧  b^{354, 1}_0 ∧  p_354) -> (-b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0)
c  in CNF:
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_2
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨  b^{354, 2}_1
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ -p_354 ∨ -b^{354, 2}_0
c  in DIMACS:
 24161  24162 -24163 -354 -24164 0
 24161  24162 -24163 -354  24165 0
 24161  24162 -24163 -354 -24166 0

c  2+1 --> break 
c    (-b^{354, 1}_2 ∧  b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧  p_354) -> break
c  in CNF:
c     b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ -p_354 ∨ break
c  in DIMACS:
 24161 -24162  24163 -354 1162 0


c  2-1 --> 1
c    (-b^{354, 1}_2 ∧  b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧ -p_354) -> (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0)
c  in CNF:
c     b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_2
c     b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_1
c     b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨  b^{354, 2}_0
c  in DIMACS:
 24161 -24162  24163  354 -24164 0
 24161 -24162  24163  354 -24165 0
 24161 -24162  24163  354  24166 0

c  1-1 --> 0
c    (-b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧  b^{354, 1}_0 ∧ -p_354) -> (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧ -b^{354, 2}_0)
c  in CNF:
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_2
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_1
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_0
c  in DIMACS:
 24161  24162 -24163  354 -24164 0
 24161  24162 -24163  354 -24165 0
 24161  24162 -24163  354 -24166 0

c  0-1 --> -1
c    (-b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧ -p_354) -> ( b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0)
c  in CNF:
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨  b^{354, 2}_2
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_1
c     b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨  b^{354, 2}_0
c  in DIMACS:
 24161  24162  24163  354  24164 0
 24161  24162  24163  354 -24165 0
 24161  24162  24163  354  24166 0

c  -1-1 --> -2
c    ( b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧  b^{354, 1}_0 ∧ -p_354) -> ( b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0)
c  in CNF:
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨  b^{354, 2}_2
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨  b^{354, 2}_1
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨  p_354 ∨ -b^{354, 2}_0
c  in DIMACS:
-24161  24162 -24163  354  24164 0
-24161  24162 -24163  354  24165 0
-24161  24162 -24163  354 -24166 0

c  -2-1 --> break 
c    ( b^{354, 1}_2 ∧  b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧ -p_354) -> break
c  in CNF:
c    -b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨  b^{354, 1}_0 ∨  p_354 ∨ break
c  in DIMACS:
-24161 -24162  24163  354 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{354, 1}_2 ∧ -b^{354, 1}_1 ∧ -b^{354, 1}_0 ∧ true) 
c  in CNF:
c    -b^{354, 1}_2 ∨  b^{354, 1}_1 ∨  b^{354, 1}_0 ∨ false 
c  in DIMACS:
-24161  24162  24163  0

c  3 does not represent an automaton state.
c    -(-b^{354, 1}_2 ∧  b^{354, 1}_1 ∧  b^{354, 1}_0 ∧ true) 
c  in CNF:
c     b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ false 
c  in DIMACS:
 24161 -24162 -24163  0
c  -3 does not represent an automaton state.
c    -( b^{354, 1}_2 ∧  b^{354, 1}_1 ∧  b^{354, 1}_0 ∧ true) 
c  in CNF:
c    -b^{354, 1}_2 ∨ -b^{354, 1}_1 ∨ -b^{354, 1}_0 ∨ false 
c  in DIMACS:
-24161 -24162 -24163  0

c i = 2
c  -2+1 --> -1
c    ( b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧  p_708) -> ( b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0)
c  in CNF:
c    -b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨  b^{354, 3}_2
c    -b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_1
c    -b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨  b^{354, 3}_0
c  in DIMACS:
-24164 -24165  24166 -708  24167 0
-24164 -24165  24166 -708 -24168 0
-24164 -24165  24166 -708  24169 0

c  -1+1 --> 0
c    ( b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0 ∧  p_708) -> (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧ -b^{354, 3}_0)
c  in CNF:
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_2
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_1
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_0
c  in DIMACS:
-24164  24165 -24166 -708 -24167 0
-24164  24165 -24166 -708 -24168 0
-24164  24165 -24166 -708 -24169 0

c  0+1 --> 1
c    (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧  p_708) -> (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0)
c  in CNF:
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_2
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_1
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨  b^{354, 3}_0
c  in DIMACS:
 24164  24165  24166 -708 -24167 0
 24164  24165  24166 -708 -24168 0
 24164  24165  24166 -708  24169 0

c  1+1 --> 2
c    (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0 ∧  p_708) -> (-b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0)
c  in CNF:
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_2
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨  b^{354, 3}_1
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ -p_708 ∨ -b^{354, 3}_0
c  in DIMACS:
 24164  24165 -24166 -708 -24167 0
 24164  24165 -24166 -708  24168 0
 24164  24165 -24166 -708 -24169 0

c  2+1 --> break 
c    (-b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧  p_708) -> break
c  in CNF:
c     b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ -p_708 ∨ break
c  in DIMACS:
 24164 -24165  24166 -708 1162 0


c  2-1 --> 1
c    (-b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧ -p_708) -> (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0)
c  in CNF:
c     b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_2
c     b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_1
c     b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨  b^{354, 3}_0
c  in DIMACS:
 24164 -24165  24166  708 -24167 0
 24164 -24165  24166  708 -24168 0
 24164 -24165  24166  708  24169 0

c  1-1 --> 0
c    (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0 ∧ -p_708) -> (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧ -b^{354, 3}_0)
c  in CNF:
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_2
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_1
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_0
c  in DIMACS:
 24164  24165 -24166  708 -24167 0
 24164  24165 -24166  708 -24168 0
 24164  24165 -24166  708 -24169 0

c  0-1 --> -1
c    (-b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧ -p_708) -> ( b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0)
c  in CNF:
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨  b^{354, 3}_2
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_1
c     b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨  b^{354, 3}_0
c  in DIMACS:
 24164  24165  24166  708  24167 0
 24164  24165  24166  708 -24168 0
 24164  24165  24166  708  24169 0

c  -1-1 --> -2
c    ( b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧  b^{354, 2}_0 ∧ -p_708) -> ( b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0)
c  in CNF:
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨  b^{354, 3}_2
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨  b^{354, 3}_1
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨  p_708 ∨ -b^{354, 3}_0
c  in DIMACS:
-24164  24165 -24166  708  24167 0
-24164  24165 -24166  708  24168 0
-24164  24165 -24166  708 -24169 0

c  -2-1 --> break 
c    ( b^{354, 2}_2 ∧  b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧ -p_708) -> break
c  in CNF:
c    -b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨  b^{354, 2}_0 ∨  p_708 ∨ break
c  in DIMACS:
-24164 -24165  24166  708 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{354, 2}_2 ∧ -b^{354, 2}_1 ∧ -b^{354, 2}_0 ∧ true) 
c  in CNF:
c    -b^{354, 2}_2 ∨  b^{354, 2}_1 ∨  b^{354, 2}_0 ∨ false 
c  in DIMACS:
-24164  24165  24166  0

c  3 does not represent an automaton state.
c    -(-b^{354, 2}_2 ∧  b^{354, 2}_1 ∧  b^{354, 2}_0 ∧ true) 
c  in CNF:
c     b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ false 
c  in DIMACS:
 24164 -24165 -24166  0
c  -3 does not represent an automaton state.
c    -( b^{354, 2}_2 ∧  b^{354, 2}_1 ∧  b^{354, 2}_0 ∧ true) 
c  in CNF:
c    -b^{354, 2}_2 ∨ -b^{354, 2}_1 ∨ -b^{354, 2}_0 ∨ false 
c  in DIMACS:
-24164 -24165 -24166  0

c i = 3
c  -2+1 --> -1
c    ( b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧  p_1062) -> ( b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧  b^{354, 4}_0)
c  in CNF:
c    -b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨  b^{354, 4}_2
c    -b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_1
c    -b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨  b^{354, 4}_0
c  in DIMACS:
-24167 -24168  24169 -1062  24170 0
-24167 -24168  24169 -1062 -24171 0
-24167 -24168  24169 -1062  24172 0

c  -1+1 --> 0
c    ( b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0 ∧  p_1062) -> (-b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧ -b^{354, 4}_0)
c  in CNF:
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_2
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_1
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_0
c  in DIMACS:
-24167  24168 -24169 -1062 -24170 0
-24167  24168 -24169 -1062 -24171 0
-24167  24168 -24169 -1062 -24172 0

c  0+1 --> 1
c    (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧  p_1062) -> (-b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧  b^{354, 4}_0)
c  in CNF:
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_2
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_1
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨  b^{354, 4}_0
c  in DIMACS:
 24167  24168  24169 -1062 -24170 0
 24167  24168  24169 -1062 -24171 0
 24167  24168  24169 -1062  24172 0

c  1+1 --> 2
c    (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0 ∧  p_1062) -> (-b^{354, 4}_2 ∧  b^{354, 4}_1 ∧ -b^{354, 4}_0)
c  in CNF:
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_2
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨  b^{354, 4}_1
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ -p_1062 ∨ -b^{354, 4}_0
c  in DIMACS:
 24167  24168 -24169 -1062 -24170 0
 24167  24168 -24169 -1062  24171 0
 24167  24168 -24169 -1062 -24172 0

c  2+1 --> break 
c    (-b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧  p_1062) -> break
c  in CNF:
c     b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ -p_1062 ∨ break
c  in DIMACS:
 24167 -24168  24169 -1062 1162 0


c  2-1 --> 1
c    (-b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧ -p_1062) -> (-b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧  b^{354, 4}_0)
c  in CNF:
c     b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_2
c     b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_1
c     b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨  b^{354, 4}_0
c  in DIMACS:
 24167 -24168  24169  1062 -24170 0
 24167 -24168  24169  1062 -24171 0
 24167 -24168  24169  1062  24172 0

c  1-1 --> 0
c    (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0 ∧ -p_1062) -> (-b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧ -b^{354, 4}_0)
c  in CNF:
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_2
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_1
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_0
c  in DIMACS:
 24167  24168 -24169  1062 -24170 0
 24167  24168 -24169  1062 -24171 0
 24167  24168 -24169  1062 -24172 0

c  0-1 --> -1
c    (-b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧ -p_1062) -> ( b^{354, 4}_2 ∧ -b^{354, 4}_1 ∧  b^{354, 4}_0)
c  in CNF:
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨  b^{354, 4}_2
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_1
c     b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨  b^{354, 4}_0
c  in DIMACS:
 24167  24168  24169  1062  24170 0
 24167  24168  24169  1062 -24171 0
 24167  24168  24169  1062  24172 0

c  -1-1 --> -2
c    ( b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧  b^{354, 3}_0 ∧ -p_1062) -> ( b^{354, 4}_2 ∧  b^{354, 4}_1 ∧ -b^{354, 4}_0)
c  in CNF:
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨  b^{354, 4}_2
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨  b^{354, 4}_1
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨  p_1062 ∨ -b^{354, 4}_0
c  in DIMACS:
-24167  24168 -24169  1062  24170 0
-24167  24168 -24169  1062  24171 0
-24167  24168 -24169  1062 -24172 0

c  -2-1 --> break 
c    ( b^{354, 3}_2 ∧  b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧ -p_1062) -> break
c  in CNF:
c    -b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨  b^{354, 3}_0 ∨  p_1062 ∨ break
c  in DIMACS:
-24167 -24168  24169  1062 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{354, 3}_2 ∧ -b^{354, 3}_1 ∧ -b^{354, 3}_0 ∧ true) 
c  in CNF:
c    -b^{354, 3}_2 ∨  b^{354, 3}_1 ∨  b^{354, 3}_0 ∨ false 
c  in DIMACS:
-24167  24168  24169  0

c  3 does not represent an automaton state.
c    -(-b^{354, 3}_2 ∧  b^{354, 3}_1 ∧  b^{354, 3}_0 ∧ true) 
c  in CNF:
c     b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ false 
c  in DIMACS:
 24167 -24168 -24169  0
c  -3 does not represent an automaton state.
c    -( b^{354, 3}_2 ∧  b^{354, 3}_1 ∧  b^{354, 3}_0 ∧ true) 
c  in CNF:
c    -b^{354, 3}_2 ∨ -b^{354, 3}_1 ∨ -b^{354, 3}_0 ∨ false 
c  in DIMACS:
-24167 -24168 -24169  0

c INIT for k = 355
c    -b^{355, 1}_2
c    -b^{355, 1}_1
c    -b^{355, 1}_0
c  in DIMACS:
-24173 0
-24174 0
-24175 0

c Transitions for k = 355
c i = 1
c  -2+1 --> -1
c    ( b^{355, 1}_2 ∧  b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧  p_355) -> ( b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0)
c  in CNF:
c    -b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨  b^{355, 2}_2
c    -b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_1
c    -b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨  b^{355, 2}_0
c  in DIMACS:
-24173 -24174  24175 -355  24176 0
-24173 -24174  24175 -355 -24177 0
-24173 -24174  24175 -355  24178 0

c  -1+1 --> 0
c    ( b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧  b^{355, 1}_0 ∧  p_355) -> (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧ -b^{355, 2}_0)
c  in CNF:
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_2
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_1
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_0
c  in DIMACS:
-24173  24174 -24175 -355 -24176 0
-24173  24174 -24175 -355 -24177 0
-24173  24174 -24175 -355 -24178 0

c  0+1 --> 1
c    (-b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧  p_355) -> (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0)
c  in CNF:
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_2
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_1
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨  b^{355, 2}_0
c  in DIMACS:
 24173  24174  24175 -355 -24176 0
 24173  24174  24175 -355 -24177 0
 24173  24174  24175 -355  24178 0

c  1+1 --> 2
c    (-b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧  b^{355, 1}_0 ∧  p_355) -> (-b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0)
c  in CNF:
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_2
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨  b^{355, 2}_1
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ -p_355 ∨ -b^{355, 2}_0
c  in DIMACS:
 24173  24174 -24175 -355 -24176 0
 24173  24174 -24175 -355  24177 0
 24173  24174 -24175 -355 -24178 0

c  2+1 --> break 
c    (-b^{355, 1}_2 ∧  b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧  p_355) -> break
c  in CNF:
c     b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ -p_355 ∨ break
c  in DIMACS:
 24173 -24174  24175 -355 1162 0


c  2-1 --> 1
c    (-b^{355, 1}_2 ∧  b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧ -p_355) -> (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0)
c  in CNF:
c     b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_2
c     b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_1
c     b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨  b^{355, 2}_0
c  in DIMACS:
 24173 -24174  24175  355 -24176 0
 24173 -24174  24175  355 -24177 0
 24173 -24174  24175  355  24178 0

c  1-1 --> 0
c    (-b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧  b^{355, 1}_0 ∧ -p_355) -> (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧ -b^{355, 2}_0)
c  in CNF:
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_2
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_1
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_0
c  in DIMACS:
 24173  24174 -24175  355 -24176 0
 24173  24174 -24175  355 -24177 0
 24173  24174 -24175  355 -24178 0

c  0-1 --> -1
c    (-b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧ -p_355) -> ( b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0)
c  in CNF:
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨  b^{355, 2}_2
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_1
c     b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨  b^{355, 2}_0
c  in DIMACS:
 24173  24174  24175  355  24176 0
 24173  24174  24175  355 -24177 0
 24173  24174  24175  355  24178 0

c  -1-1 --> -2
c    ( b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧  b^{355, 1}_0 ∧ -p_355) -> ( b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0)
c  in CNF:
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨  b^{355, 2}_2
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨  b^{355, 2}_1
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨  p_355 ∨ -b^{355, 2}_0
c  in DIMACS:
-24173  24174 -24175  355  24176 0
-24173  24174 -24175  355  24177 0
-24173  24174 -24175  355 -24178 0

c  -2-1 --> break 
c    ( b^{355, 1}_2 ∧  b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧ -p_355) -> break
c  in CNF:
c    -b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨  b^{355, 1}_0 ∨  p_355 ∨ break
c  in DIMACS:
-24173 -24174  24175  355 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{355, 1}_2 ∧ -b^{355, 1}_1 ∧ -b^{355, 1}_0 ∧ true) 
c  in CNF:
c    -b^{355, 1}_2 ∨  b^{355, 1}_1 ∨  b^{355, 1}_0 ∨ false 
c  in DIMACS:
-24173  24174  24175  0

c  3 does not represent an automaton state.
c    -(-b^{355, 1}_2 ∧  b^{355, 1}_1 ∧  b^{355, 1}_0 ∧ true) 
c  in CNF:
c     b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ false 
c  in DIMACS:
 24173 -24174 -24175  0
c  -3 does not represent an automaton state.
c    -( b^{355, 1}_2 ∧  b^{355, 1}_1 ∧  b^{355, 1}_0 ∧ true) 
c  in CNF:
c    -b^{355, 1}_2 ∨ -b^{355, 1}_1 ∨ -b^{355, 1}_0 ∨ false 
c  in DIMACS:
-24173 -24174 -24175  0

c i = 2
c  -2+1 --> -1
c    ( b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧  p_710) -> ( b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0)
c  in CNF:
c    -b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨  b^{355, 3}_2
c    -b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_1
c    -b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨  b^{355, 3}_0
c  in DIMACS:
-24176 -24177  24178 -710  24179 0
-24176 -24177  24178 -710 -24180 0
-24176 -24177  24178 -710  24181 0

c  -1+1 --> 0
c    ( b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0 ∧  p_710) -> (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧ -b^{355, 3}_0)
c  in CNF:
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_2
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_1
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_0
c  in DIMACS:
-24176  24177 -24178 -710 -24179 0
-24176  24177 -24178 -710 -24180 0
-24176  24177 -24178 -710 -24181 0

c  0+1 --> 1
c    (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧  p_710) -> (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0)
c  in CNF:
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_2
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_1
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨  b^{355, 3}_0
c  in DIMACS:
 24176  24177  24178 -710 -24179 0
 24176  24177  24178 -710 -24180 0
 24176  24177  24178 -710  24181 0

c  1+1 --> 2
c    (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0 ∧  p_710) -> (-b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0)
c  in CNF:
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_2
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨  b^{355, 3}_1
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ -p_710 ∨ -b^{355, 3}_0
c  in DIMACS:
 24176  24177 -24178 -710 -24179 0
 24176  24177 -24178 -710  24180 0
 24176  24177 -24178 -710 -24181 0

c  2+1 --> break 
c    (-b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧  p_710) -> break
c  in CNF:
c     b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ -p_710 ∨ break
c  in DIMACS:
 24176 -24177  24178 -710 1162 0


c  2-1 --> 1
c    (-b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧ -p_710) -> (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0)
c  in CNF:
c     b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_2
c     b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_1
c     b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨  b^{355, 3}_0
c  in DIMACS:
 24176 -24177  24178  710 -24179 0
 24176 -24177  24178  710 -24180 0
 24176 -24177  24178  710  24181 0

c  1-1 --> 0
c    (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0 ∧ -p_710) -> (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧ -b^{355, 3}_0)
c  in CNF:
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_2
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_1
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_0
c  in DIMACS:
 24176  24177 -24178  710 -24179 0
 24176  24177 -24178  710 -24180 0
 24176  24177 -24178  710 -24181 0

c  0-1 --> -1
c    (-b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧ -p_710) -> ( b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0)
c  in CNF:
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨  b^{355, 3}_2
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_1
c     b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨  b^{355, 3}_0
c  in DIMACS:
 24176  24177  24178  710  24179 0
 24176  24177  24178  710 -24180 0
 24176  24177  24178  710  24181 0

c  -1-1 --> -2
c    ( b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧  b^{355, 2}_0 ∧ -p_710) -> ( b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0)
c  in CNF:
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨  b^{355, 3}_2
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨  b^{355, 3}_1
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨  p_710 ∨ -b^{355, 3}_0
c  in DIMACS:
-24176  24177 -24178  710  24179 0
-24176  24177 -24178  710  24180 0
-24176  24177 -24178  710 -24181 0

c  -2-1 --> break 
c    ( b^{355, 2}_2 ∧  b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧ -p_710) -> break
c  in CNF:
c    -b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨  b^{355, 2}_0 ∨  p_710 ∨ break
c  in DIMACS:
-24176 -24177  24178  710 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{355, 2}_2 ∧ -b^{355, 2}_1 ∧ -b^{355, 2}_0 ∧ true) 
c  in CNF:
c    -b^{355, 2}_2 ∨  b^{355, 2}_1 ∨  b^{355, 2}_0 ∨ false 
c  in DIMACS:
-24176  24177  24178  0

c  3 does not represent an automaton state.
c    -(-b^{355, 2}_2 ∧  b^{355, 2}_1 ∧  b^{355, 2}_0 ∧ true) 
c  in CNF:
c     b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ false 
c  in DIMACS:
 24176 -24177 -24178  0
c  -3 does not represent an automaton state.
c    -( b^{355, 2}_2 ∧  b^{355, 2}_1 ∧  b^{355, 2}_0 ∧ true) 
c  in CNF:
c    -b^{355, 2}_2 ∨ -b^{355, 2}_1 ∨ -b^{355, 2}_0 ∨ false 
c  in DIMACS:
-24176 -24177 -24178  0

c i = 3
c  -2+1 --> -1
c    ( b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧  p_1065) -> ( b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧  b^{355, 4}_0)
c  in CNF:
c    -b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨  b^{355, 4}_2
c    -b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_1
c    -b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨  b^{355, 4}_0
c  in DIMACS:
-24179 -24180  24181 -1065  24182 0
-24179 -24180  24181 -1065 -24183 0
-24179 -24180  24181 -1065  24184 0

c  -1+1 --> 0
c    ( b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0 ∧  p_1065) -> (-b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧ -b^{355, 4}_0)
c  in CNF:
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_2
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_1
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_0
c  in DIMACS:
-24179  24180 -24181 -1065 -24182 0
-24179  24180 -24181 -1065 -24183 0
-24179  24180 -24181 -1065 -24184 0

c  0+1 --> 1
c    (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧  p_1065) -> (-b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧  b^{355, 4}_0)
c  in CNF:
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_2
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_1
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨  b^{355, 4}_0
c  in DIMACS:
 24179  24180  24181 -1065 -24182 0
 24179  24180  24181 -1065 -24183 0
 24179  24180  24181 -1065  24184 0

c  1+1 --> 2
c    (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0 ∧  p_1065) -> (-b^{355, 4}_2 ∧  b^{355, 4}_1 ∧ -b^{355, 4}_0)
c  in CNF:
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_2
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨  b^{355, 4}_1
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ -p_1065 ∨ -b^{355, 4}_0
c  in DIMACS:
 24179  24180 -24181 -1065 -24182 0
 24179  24180 -24181 -1065  24183 0
 24179  24180 -24181 -1065 -24184 0

c  2+1 --> break 
c    (-b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧  p_1065) -> break
c  in CNF:
c     b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ -p_1065 ∨ break
c  in DIMACS:
 24179 -24180  24181 -1065 1162 0


c  2-1 --> 1
c    (-b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧ -p_1065) -> (-b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧  b^{355, 4}_0)
c  in CNF:
c     b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_2
c     b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_1
c     b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨  b^{355, 4}_0
c  in DIMACS:
 24179 -24180  24181  1065 -24182 0
 24179 -24180  24181  1065 -24183 0
 24179 -24180  24181  1065  24184 0

c  1-1 --> 0
c    (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0 ∧ -p_1065) -> (-b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧ -b^{355, 4}_0)
c  in CNF:
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_2
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_1
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_0
c  in DIMACS:
 24179  24180 -24181  1065 -24182 0
 24179  24180 -24181  1065 -24183 0
 24179  24180 -24181  1065 -24184 0

c  0-1 --> -1
c    (-b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧ -p_1065) -> ( b^{355, 4}_2 ∧ -b^{355, 4}_1 ∧  b^{355, 4}_0)
c  in CNF:
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨  b^{355, 4}_2
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_1
c     b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨  b^{355, 4}_0
c  in DIMACS:
 24179  24180  24181  1065  24182 0
 24179  24180  24181  1065 -24183 0
 24179  24180  24181  1065  24184 0

c  -1-1 --> -2
c    ( b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧  b^{355, 3}_0 ∧ -p_1065) -> ( b^{355, 4}_2 ∧  b^{355, 4}_1 ∧ -b^{355, 4}_0)
c  in CNF:
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨  b^{355, 4}_2
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨  b^{355, 4}_1
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨  p_1065 ∨ -b^{355, 4}_0
c  in DIMACS:
-24179  24180 -24181  1065  24182 0
-24179  24180 -24181  1065  24183 0
-24179  24180 -24181  1065 -24184 0

c  -2-1 --> break 
c    ( b^{355, 3}_2 ∧  b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧ -p_1065) -> break
c  in CNF:
c    -b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨  b^{355, 3}_0 ∨  p_1065 ∨ break
c  in DIMACS:
-24179 -24180  24181  1065 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{355, 3}_2 ∧ -b^{355, 3}_1 ∧ -b^{355, 3}_0 ∧ true) 
c  in CNF:
c    -b^{355, 3}_2 ∨  b^{355, 3}_1 ∨  b^{355, 3}_0 ∨ false 
c  in DIMACS:
-24179  24180  24181  0

c  3 does not represent an automaton state.
c    -(-b^{355, 3}_2 ∧  b^{355, 3}_1 ∧  b^{355, 3}_0 ∧ true) 
c  in CNF:
c     b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ false 
c  in DIMACS:
 24179 -24180 -24181  0
c  -3 does not represent an automaton state.
c    -( b^{355, 3}_2 ∧  b^{355, 3}_1 ∧  b^{355, 3}_0 ∧ true) 
c  in CNF:
c    -b^{355, 3}_2 ∨ -b^{355, 3}_1 ∨ -b^{355, 3}_0 ∨ false 
c  in DIMACS:
-24179 -24180 -24181  0

c INIT for k = 356
c    -b^{356, 1}_2
c    -b^{356, 1}_1
c    -b^{356, 1}_0
c  in DIMACS:
-24185 0
-24186 0
-24187 0

c Transitions for k = 356
c i = 1
c  -2+1 --> -1
c    ( b^{356, 1}_2 ∧  b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧  p_356) -> ( b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0)
c  in CNF:
c    -b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨  b^{356, 2}_2
c    -b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_1
c    -b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨  b^{356, 2}_0
c  in DIMACS:
-24185 -24186  24187 -356  24188 0
-24185 -24186  24187 -356 -24189 0
-24185 -24186  24187 -356  24190 0

c  -1+1 --> 0
c    ( b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧  b^{356, 1}_0 ∧  p_356) -> (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧ -b^{356, 2}_0)
c  in CNF:
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_2
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_1
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_0
c  in DIMACS:
-24185  24186 -24187 -356 -24188 0
-24185  24186 -24187 -356 -24189 0
-24185  24186 -24187 -356 -24190 0

c  0+1 --> 1
c    (-b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧  p_356) -> (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0)
c  in CNF:
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_2
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_1
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨  b^{356, 2}_0
c  in DIMACS:
 24185  24186  24187 -356 -24188 0
 24185  24186  24187 -356 -24189 0
 24185  24186  24187 -356  24190 0

c  1+1 --> 2
c    (-b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧  b^{356, 1}_0 ∧  p_356) -> (-b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0)
c  in CNF:
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_2
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨  b^{356, 2}_1
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ -p_356 ∨ -b^{356, 2}_0
c  in DIMACS:
 24185  24186 -24187 -356 -24188 0
 24185  24186 -24187 -356  24189 0
 24185  24186 -24187 -356 -24190 0

c  2+1 --> break 
c    (-b^{356, 1}_2 ∧  b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧  p_356) -> break
c  in CNF:
c     b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ -p_356 ∨ break
c  in DIMACS:
 24185 -24186  24187 -356 1162 0


c  2-1 --> 1
c    (-b^{356, 1}_2 ∧  b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧ -p_356) -> (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0)
c  in CNF:
c     b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_2
c     b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_1
c     b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨  b^{356, 2}_0
c  in DIMACS:
 24185 -24186  24187  356 -24188 0
 24185 -24186  24187  356 -24189 0
 24185 -24186  24187  356  24190 0

c  1-1 --> 0
c    (-b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧  b^{356, 1}_0 ∧ -p_356) -> (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧ -b^{356, 2}_0)
c  in CNF:
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_2
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_1
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_0
c  in DIMACS:
 24185  24186 -24187  356 -24188 0
 24185  24186 -24187  356 -24189 0
 24185  24186 -24187  356 -24190 0

c  0-1 --> -1
c    (-b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧ -p_356) -> ( b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0)
c  in CNF:
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨  b^{356, 2}_2
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_1
c     b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨  b^{356, 2}_0
c  in DIMACS:
 24185  24186  24187  356  24188 0
 24185  24186  24187  356 -24189 0
 24185  24186  24187  356  24190 0

c  -1-1 --> -2
c    ( b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧  b^{356, 1}_0 ∧ -p_356) -> ( b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0)
c  in CNF:
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨  b^{356, 2}_2
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨  b^{356, 2}_1
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨  p_356 ∨ -b^{356, 2}_0
c  in DIMACS:
-24185  24186 -24187  356  24188 0
-24185  24186 -24187  356  24189 0
-24185  24186 -24187  356 -24190 0

c  -2-1 --> break 
c    ( b^{356, 1}_2 ∧  b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧ -p_356) -> break
c  in CNF:
c    -b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨  b^{356, 1}_0 ∨  p_356 ∨ break
c  in DIMACS:
-24185 -24186  24187  356 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{356, 1}_2 ∧ -b^{356, 1}_1 ∧ -b^{356, 1}_0 ∧ true) 
c  in CNF:
c    -b^{356, 1}_2 ∨  b^{356, 1}_1 ∨  b^{356, 1}_0 ∨ false 
c  in DIMACS:
-24185  24186  24187  0

c  3 does not represent an automaton state.
c    -(-b^{356, 1}_2 ∧  b^{356, 1}_1 ∧  b^{356, 1}_0 ∧ true) 
c  in CNF:
c     b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ false 
c  in DIMACS:
 24185 -24186 -24187  0
c  -3 does not represent an automaton state.
c    -( b^{356, 1}_2 ∧  b^{356, 1}_1 ∧  b^{356, 1}_0 ∧ true) 
c  in CNF:
c    -b^{356, 1}_2 ∨ -b^{356, 1}_1 ∨ -b^{356, 1}_0 ∨ false 
c  in DIMACS:
-24185 -24186 -24187  0

c i = 2
c  -2+1 --> -1
c    ( b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧  p_712) -> ( b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0)
c  in CNF:
c    -b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨  b^{356, 3}_2
c    -b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_1
c    -b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨  b^{356, 3}_0
c  in DIMACS:
-24188 -24189  24190 -712  24191 0
-24188 -24189  24190 -712 -24192 0
-24188 -24189  24190 -712  24193 0

c  -1+1 --> 0
c    ( b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0 ∧  p_712) -> (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧ -b^{356, 3}_0)
c  in CNF:
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_2
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_1
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_0
c  in DIMACS:
-24188  24189 -24190 -712 -24191 0
-24188  24189 -24190 -712 -24192 0
-24188  24189 -24190 -712 -24193 0

c  0+1 --> 1
c    (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧  p_712) -> (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0)
c  in CNF:
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_2
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_1
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨  b^{356, 3}_0
c  in DIMACS:
 24188  24189  24190 -712 -24191 0
 24188  24189  24190 -712 -24192 0
 24188  24189  24190 -712  24193 0

c  1+1 --> 2
c    (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0 ∧  p_712) -> (-b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0)
c  in CNF:
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_2
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨  b^{356, 3}_1
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ -p_712 ∨ -b^{356, 3}_0
c  in DIMACS:
 24188  24189 -24190 -712 -24191 0
 24188  24189 -24190 -712  24192 0
 24188  24189 -24190 -712 -24193 0

c  2+1 --> break 
c    (-b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧  p_712) -> break
c  in CNF:
c     b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ -p_712 ∨ break
c  in DIMACS:
 24188 -24189  24190 -712 1162 0


c  2-1 --> 1
c    (-b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧ -p_712) -> (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0)
c  in CNF:
c     b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_2
c     b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_1
c     b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨  b^{356, 3}_0
c  in DIMACS:
 24188 -24189  24190  712 -24191 0
 24188 -24189  24190  712 -24192 0
 24188 -24189  24190  712  24193 0

c  1-1 --> 0
c    (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0 ∧ -p_712) -> (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧ -b^{356, 3}_0)
c  in CNF:
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_2
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_1
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_0
c  in DIMACS:
 24188  24189 -24190  712 -24191 0
 24188  24189 -24190  712 -24192 0
 24188  24189 -24190  712 -24193 0

c  0-1 --> -1
c    (-b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧ -p_712) -> ( b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0)
c  in CNF:
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨  b^{356, 3}_2
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_1
c     b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨  b^{356, 3}_0
c  in DIMACS:
 24188  24189  24190  712  24191 0
 24188  24189  24190  712 -24192 0
 24188  24189  24190  712  24193 0

c  -1-1 --> -2
c    ( b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧  b^{356, 2}_0 ∧ -p_712) -> ( b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0)
c  in CNF:
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨  b^{356, 3}_2
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨  b^{356, 3}_1
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨  p_712 ∨ -b^{356, 3}_0
c  in DIMACS:
-24188  24189 -24190  712  24191 0
-24188  24189 -24190  712  24192 0
-24188  24189 -24190  712 -24193 0

c  -2-1 --> break 
c    ( b^{356, 2}_2 ∧  b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧ -p_712) -> break
c  in CNF:
c    -b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨  b^{356, 2}_0 ∨  p_712 ∨ break
c  in DIMACS:
-24188 -24189  24190  712 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{356, 2}_2 ∧ -b^{356, 2}_1 ∧ -b^{356, 2}_0 ∧ true) 
c  in CNF:
c    -b^{356, 2}_2 ∨  b^{356, 2}_1 ∨  b^{356, 2}_0 ∨ false 
c  in DIMACS:
-24188  24189  24190  0

c  3 does not represent an automaton state.
c    -(-b^{356, 2}_2 ∧  b^{356, 2}_1 ∧  b^{356, 2}_0 ∧ true) 
c  in CNF:
c     b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ false 
c  in DIMACS:
 24188 -24189 -24190  0
c  -3 does not represent an automaton state.
c    -( b^{356, 2}_2 ∧  b^{356, 2}_1 ∧  b^{356, 2}_0 ∧ true) 
c  in CNF:
c    -b^{356, 2}_2 ∨ -b^{356, 2}_1 ∨ -b^{356, 2}_0 ∨ false 
c  in DIMACS:
-24188 -24189 -24190  0

c i = 3
c  -2+1 --> -1
c    ( b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧  p_1068) -> ( b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧  b^{356, 4}_0)
c  in CNF:
c    -b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨  b^{356, 4}_2
c    -b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_1
c    -b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨  b^{356, 4}_0
c  in DIMACS:
-24191 -24192  24193 -1068  24194 0
-24191 -24192  24193 -1068 -24195 0
-24191 -24192  24193 -1068  24196 0

c  -1+1 --> 0
c    ( b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0 ∧  p_1068) -> (-b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧ -b^{356, 4}_0)
c  in CNF:
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_2
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_1
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_0
c  in DIMACS:
-24191  24192 -24193 -1068 -24194 0
-24191  24192 -24193 -1068 -24195 0
-24191  24192 -24193 -1068 -24196 0

c  0+1 --> 1
c    (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧  p_1068) -> (-b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧  b^{356, 4}_0)
c  in CNF:
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_2
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_1
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨  b^{356, 4}_0
c  in DIMACS:
 24191  24192  24193 -1068 -24194 0
 24191  24192  24193 -1068 -24195 0
 24191  24192  24193 -1068  24196 0

c  1+1 --> 2
c    (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0 ∧  p_1068) -> (-b^{356, 4}_2 ∧  b^{356, 4}_1 ∧ -b^{356, 4}_0)
c  in CNF:
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_2
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨  b^{356, 4}_1
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ -p_1068 ∨ -b^{356, 4}_0
c  in DIMACS:
 24191  24192 -24193 -1068 -24194 0
 24191  24192 -24193 -1068  24195 0
 24191  24192 -24193 -1068 -24196 0

c  2+1 --> break 
c    (-b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧  p_1068) -> break
c  in CNF:
c     b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ -p_1068 ∨ break
c  in DIMACS:
 24191 -24192  24193 -1068 1162 0


c  2-1 --> 1
c    (-b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧ -p_1068) -> (-b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧  b^{356, 4}_0)
c  in CNF:
c     b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_2
c     b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_1
c     b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨  b^{356, 4}_0
c  in DIMACS:
 24191 -24192  24193  1068 -24194 0
 24191 -24192  24193  1068 -24195 0
 24191 -24192  24193  1068  24196 0

c  1-1 --> 0
c    (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0 ∧ -p_1068) -> (-b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧ -b^{356, 4}_0)
c  in CNF:
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_2
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_1
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_0
c  in DIMACS:
 24191  24192 -24193  1068 -24194 0
 24191  24192 -24193  1068 -24195 0
 24191  24192 -24193  1068 -24196 0

c  0-1 --> -1
c    (-b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧ -p_1068) -> ( b^{356, 4}_2 ∧ -b^{356, 4}_1 ∧  b^{356, 4}_0)
c  in CNF:
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨  b^{356, 4}_2
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_1
c     b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨  b^{356, 4}_0
c  in DIMACS:
 24191  24192  24193  1068  24194 0
 24191  24192  24193  1068 -24195 0
 24191  24192  24193  1068  24196 0

c  -1-1 --> -2
c    ( b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧  b^{356, 3}_0 ∧ -p_1068) -> ( b^{356, 4}_2 ∧  b^{356, 4}_1 ∧ -b^{356, 4}_0)
c  in CNF:
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨  b^{356, 4}_2
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨  b^{356, 4}_1
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨  p_1068 ∨ -b^{356, 4}_0
c  in DIMACS:
-24191  24192 -24193  1068  24194 0
-24191  24192 -24193  1068  24195 0
-24191  24192 -24193  1068 -24196 0

c  -2-1 --> break 
c    ( b^{356, 3}_2 ∧  b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧ -p_1068) -> break
c  in CNF:
c    -b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨  b^{356, 3}_0 ∨  p_1068 ∨ break
c  in DIMACS:
-24191 -24192  24193  1068 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{356, 3}_2 ∧ -b^{356, 3}_1 ∧ -b^{356, 3}_0 ∧ true) 
c  in CNF:
c    -b^{356, 3}_2 ∨  b^{356, 3}_1 ∨  b^{356, 3}_0 ∨ false 
c  in DIMACS:
-24191  24192  24193  0

c  3 does not represent an automaton state.
c    -(-b^{356, 3}_2 ∧  b^{356, 3}_1 ∧  b^{356, 3}_0 ∧ true) 
c  in CNF:
c     b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ false 
c  in DIMACS:
 24191 -24192 -24193  0
c  -3 does not represent an automaton state.
c    -( b^{356, 3}_2 ∧  b^{356, 3}_1 ∧  b^{356, 3}_0 ∧ true) 
c  in CNF:
c    -b^{356, 3}_2 ∨ -b^{356, 3}_1 ∨ -b^{356, 3}_0 ∨ false 
c  in DIMACS:
-24191 -24192 -24193  0

c INIT for k = 357
c    -b^{357, 1}_2
c    -b^{357, 1}_1
c    -b^{357, 1}_0
c  in DIMACS:
-24197 0
-24198 0
-24199 0

c Transitions for k = 357
c i = 1
c  -2+1 --> -1
c    ( b^{357, 1}_2 ∧  b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧  p_357) -> ( b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0)
c  in CNF:
c    -b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨  b^{357, 2}_2
c    -b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_1
c    -b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨  b^{357, 2}_0
c  in DIMACS:
-24197 -24198  24199 -357  24200 0
-24197 -24198  24199 -357 -24201 0
-24197 -24198  24199 -357  24202 0

c  -1+1 --> 0
c    ( b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧  b^{357, 1}_0 ∧  p_357) -> (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧ -b^{357, 2}_0)
c  in CNF:
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_2
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_1
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_0
c  in DIMACS:
-24197  24198 -24199 -357 -24200 0
-24197  24198 -24199 -357 -24201 0
-24197  24198 -24199 -357 -24202 0

c  0+1 --> 1
c    (-b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧  p_357) -> (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0)
c  in CNF:
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_2
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_1
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨  b^{357, 2}_0
c  in DIMACS:
 24197  24198  24199 -357 -24200 0
 24197  24198  24199 -357 -24201 0
 24197  24198  24199 -357  24202 0

c  1+1 --> 2
c    (-b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧  b^{357, 1}_0 ∧  p_357) -> (-b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0)
c  in CNF:
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_2
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨  b^{357, 2}_1
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ -p_357 ∨ -b^{357, 2}_0
c  in DIMACS:
 24197  24198 -24199 -357 -24200 0
 24197  24198 -24199 -357  24201 0
 24197  24198 -24199 -357 -24202 0

c  2+1 --> break 
c    (-b^{357, 1}_2 ∧  b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧  p_357) -> break
c  in CNF:
c     b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ -p_357 ∨ break
c  in DIMACS:
 24197 -24198  24199 -357 1162 0


c  2-1 --> 1
c    (-b^{357, 1}_2 ∧  b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧ -p_357) -> (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0)
c  in CNF:
c     b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_2
c     b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_1
c     b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨  b^{357, 2}_0
c  in DIMACS:
 24197 -24198  24199  357 -24200 0
 24197 -24198  24199  357 -24201 0
 24197 -24198  24199  357  24202 0

c  1-1 --> 0
c    (-b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧  b^{357, 1}_0 ∧ -p_357) -> (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧ -b^{357, 2}_0)
c  in CNF:
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_2
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_1
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_0
c  in DIMACS:
 24197  24198 -24199  357 -24200 0
 24197  24198 -24199  357 -24201 0
 24197  24198 -24199  357 -24202 0

c  0-1 --> -1
c    (-b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧ -p_357) -> ( b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0)
c  in CNF:
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨  b^{357, 2}_2
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_1
c     b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨  b^{357, 2}_0
c  in DIMACS:
 24197  24198  24199  357  24200 0
 24197  24198  24199  357 -24201 0
 24197  24198  24199  357  24202 0

c  -1-1 --> -2
c    ( b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧  b^{357, 1}_0 ∧ -p_357) -> ( b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0)
c  in CNF:
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨  b^{357, 2}_2
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨  b^{357, 2}_1
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨  p_357 ∨ -b^{357, 2}_0
c  in DIMACS:
-24197  24198 -24199  357  24200 0
-24197  24198 -24199  357  24201 0
-24197  24198 -24199  357 -24202 0

c  -2-1 --> break 
c    ( b^{357, 1}_2 ∧  b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧ -p_357) -> break
c  in CNF:
c    -b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨  b^{357, 1}_0 ∨  p_357 ∨ break
c  in DIMACS:
-24197 -24198  24199  357 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{357, 1}_2 ∧ -b^{357, 1}_1 ∧ -b^{357, 1}_0 ∧ true) 
c  in CNF:
c    -b^{357, 1}_2 ∨  b^{357, 1}_1 ∨  b^{357, 1}_0 ∨ false 
c  in DIMACS:
-24197  24198  24199  0

c  3 does not represent an automaton state.
c    -(-b^{357, 1}_2 ∧  b^{357, 1}_1 ∧  b^{357, 1}_0 ∧ true) 
c  in CNF:
c     b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ false 
c  in DIMACS:
 24197 -24198 -24199  0
c  -3 does not represent an automaton state.
c    -( b^{357, 1}_2 ∧  b^{357, 1}_1 ∧  b^{357, 1}_0 ∧ true) 
c  in CNF:
c    -b^{357, 1}_2 ∨ -b^{357, 1}_1 ∨ -b^{357, 1}_0 ∨ false 
c  in DIMACS:
-24197 -24198 -24199  0

c i = 2
c  -2+1 --> -1
c    ( b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧  p_714) -> ( b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0)
c  in CNF:
c    -b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨  b^{357, 3}_2
c    -b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_1
c    -b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨  b^{357, 3}_0
c  in DIMACS:
-24200 -24201  24202 -714  24203 0
-24200 -24201  24202 -714 -24204 0
-24200 -24201  24202 -714  24205 0

c  -1+1 --> 0
c    ( b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0 ∧  p_714) -> (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧ -b^{357, 3}_0)
c  in CNF:
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_2
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_1
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_0
c  in DIMACS:
-24200  24201 -24202 -714 -24203 0
-24200  24201 -24202 -714 -24204 0
-24200  24201 -24202 -714 -24205 0

c  0+1 --> 1
c    (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧  p_714) -> (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0)
c  in CNF:
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_2
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_1
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨  b^{357, 3}_0
c  in DIMACS:
 24200  24201  24202 -714 -24203 0
 24200  24201  24202 -714 -24204 0
 24200  24201  24202 -714  24205 0

c  1+1 --> 2
c    (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0 ∧  p_714) -> (-b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0)
c  in CNF:
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_2
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨  b^{357, 3}_1
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ -p_714 ∨ -b^{357, 3}_0
c  in DIMACS:
 24200  24201 -24202 -714 -24203 0
 24200  24201 -24202 -714  24204 0
 24200  24201 -24202 -714 -24205 0

c  2+1 --> break 
c    (-b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧  p_714) -> break
c  in CNF:
c     b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ -p_714 ∨ break
c  in DIMACS:
 24200 -24201  24202 -714 1162 0


c  2-1 --> 1
c    (-b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧ -p_714) -> (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0)
c  in CNF:
c     b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_2
c     b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_1
c     b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨  b^{357, 3}_0
c  in DIMACS:
 24200 -24201  24202  714 -24203 0
 24200 -24201  24202  714 -24204 0
 24200 -24201  24202  714  24205 0

c  1-1 --> 0
c    (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0 ∧ -p_714) -> (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧ -b^{357, 3}_0)
c  in CNF:
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_2
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_1
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_0
c  in DIMACS:
 24200  24201 -24202  714 -24203 0
 24200  24201 -24202  714 -24204 0
 24200  24201 -24202  714 -24205 0

c  0-1 --> -1
c    (-b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧ -p_714) -> ( b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0)
c  in CNF:
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨  b^{357, 3}_2
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_1
c     b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨  b^{357, 3}_0
c  in DIMACS:
 24200  24201  24202  714  24203 0
 24200  24201  24202  714 -24204 0
 24200  24201  24202  714  24205 0

c  -1-1 --> -2
c    ( b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧  b^{357, 2}_0 ∧ -p_714) -> ( b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0)
c  in CNF:
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨  b^{357, 3}_2
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨  b^{357, 3}_1
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨  p_714 ∨ -b^{357, 3}_0
c  in DIMACS:
-24200  24201 -24202  714  24203 0
-24200  24201 -24202  714  24204 0
-24200  24201 -24202  714 -24205 0

c  -2-1 --> break 
c    ( b^{357, 2}_2 ∧  b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧ -p_714) -> break
c  in CNF:
c    -b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨  b^{357, 2}_0 ∨  p_714 ∨ break
c  in DIMACS:
-24200 -24201  24202  714 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{357, 2}_2 ∧ -b^{357, 2}_1 ∧ -b^{357, 2}_0 ∧ true) 
c  in CNF:
c    -b^{357, 2}_2 ∨  b^{357, 2}_1 ∨  b^{357, 2}_0 ∨ false 
c  in DIMACS:
-24200  24201  24202  0

c  3 does not represent an automaton state.
c    -(-b^{357, 2}_2 ∧  b^{357, 2}_1 ∧  b^{357, 2}_0 ∧ true) 
c  in CNF:
c     b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ false 
c  in DIMACS:
 24200 -24201 -24202  0
c  -3 does not represent an automaton state.
c    -( b^{357, 2}_2 ∧  b^{357, 2}_1 ∧  b^{357, 2}_0 ∧ true) 
c  in CNF:
c    -b^{357, 2}_2 ∨ -b^{357, 2}_1 ∨ -b^{357, 2}_0 ∨ false 
c  in DIMACS:
-24200 -24201 -24202  0

c i = 3
c  -2+1 --> -1
c    ( b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧  p_1071) -> ( b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧  b^{357, 4}_0)
c  in CNF:
c    -b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨  b^{357, 4}_2
c    -b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_1
c    -b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨  b^{357, 4}_0
c  in DIMACS:
-24203 -24204  24205 -1071  24206 0
-24203 -24204  24205 -1071 -24207 0
-24203 -24204  24205 -1071  24208 0

c  -1+1 --> 0
c    ( b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0 ∧  p_1071) -> (-b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧ -b^{357, 4}_0)
c  in CNF:
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_2
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_1
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_0
c  in DIMACS:
-24203  24204 -24205 -1071 -24206 0
-24203  24204 -24205 -1071 -24207 0
-24203  24204 -24205 -1071 -24208 0

c  0+1 --> 1
c    (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧  p_1071) -> (-b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧  b^{357, 4}_0)
c  in CNF:
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_2
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_1
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨  b^{357, 4}_0
c  in DIMACS:
 24203  24204  24205 -1071 -24206 0
 24203  24204  24205 -1071 -24207 0
 24203  24204  24205 -1071  24208 0

c  1+1 --> 2
c    (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0 ∧  p_1071) -> (-b^{357, 4}_2 ∧  b^{357, 4}_1 ∧ -b^{357, 4}_0)
c  in CNF:
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_2
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨  b^{357, 4}_1
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ -p_1071 ∨ -b^{357, 4}_0
c  in DIMACS:
 24203  24204 -24205 -1071 -24206 0
 24203  24204 -24205 -1071  24207 0
 24203  24204 -24205 -1071 -24208 0

c  2+1 --> break 
c    (-b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧  p_1071) -> break
c  in CNF:
c     b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ -p_1071 ∨ break
c  in DIMACS:
 24203 -24204  24205 -1071 1162 0


c  2-1 --> 1
c    (-b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧ -p_1071) -> (-b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧  b^{357, 4}_0)
c  in CNF:
c     b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_2
c     b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_1
c     b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨  b^{357, 4}_0
c  in DIMACS:
 24203 -24204  24205  1071 -24206 0
 24203 -24204  24205  1071 -24207 0
 24203 -24204  24205  1071  24208 0

c  1-1 --> 0
c    (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0 ∧ -p_1071) -> (-b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧ -b^{357, 4}_0)
c  in CNF:
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_2
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_1
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_0
c  in DIMACS:
 24203  24204 -24205  1071 -24206 0
 24203  24204 -24205  1071 -24207 0
 24203  24204 -24205  1071 -24208 0

c  0-1 --> -1
c    (-b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧ -p_1071) -> ( b^{357, 4}_2 ∧ -b^{357, 4}_1 ∧  b^{357, 4}_0)
c  in CNF:
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨  b^{357, 4}_2
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_1
c     b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨  b^{357, 4}_0
c  in DIMACS:
 24203  24204  24205  1071  24206 0
 24203  24204  24205  1071 -24207 0
 24203  24204  24205  1071  24208 0

c  -1-1 --> -2
c    ( b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧  b^{357, 3}_0 ∧ -p_1071) -> ( b^{357, 4}_2 ∧  b^{357, 4}_1 ∧ -b^{357, 4}_0)
c  in CNF:
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨  b^{357, 4}_2
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨  b^{357, 4}_1
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨  p_1071 ∨ -b^{357, 4}_0
c  in DIMACS:
-24203  24204 -24205  1071  24206 0
-24203  24204 -24205  1071  24207 0
-24203  24204 -24205  1071 -24208 0

c  -2-1 --> break 
c    ( b^{357, 3}_2 ∧  b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧ -p_1071) -> break
c  in CNF:
c    -b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨  b^{357, 3}_0 ∨  p_1071 ∨ break
c  in DIMACS:
-24203 -24204  24205  1071 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{357, 3}_2 ∧ -b^{357, 3}_1 ∧ -b^{357, 3}_0 ∧ true) 
c  in CNF:
c    -b^{357, 3}_2 ∨  b^{357, 3}_1 ∨  b^{357, 3}_0 ∨ false 
c  in DIMACS:
-24203  24204  24205  0

c  3 does not represent an automaton state.
c    -(-b^{357, 3}_2 ∧  b^{357, 3}_1 ∧  b^{357, 3}_0 ∧ true) 
c  in CNF:
c     b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ false 
c  in DIMACS:
 24203 -24204 -24205  0
c  -3 does not represent an automaton state.
c    -( b^{357, 3}_2 ∧  b^{357, 3}_1 ∧  b^{357, 3}_0 ∧ true) 
c  in CNF:
c    -b^{357, 3}_2 ∨ -b^{357, 3}_1 ∨ -b^{357, 3}_0 ∨ false 
c  in DIMACS:
-24203 -24204 -24205  0

c INIT for k = 358
c    -b^{358, 1}_2
c    -b^{358, 1}_1
c    -b^{358, 1}_0
c  in DIMACS:
-24209 0
-24210 0
-24211 0

c Transitions for k = 358
c i = 1
c  -2+1 --> -1
c    ( b^{358, 1}_2 ∧  b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧  p_358) -> ( b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0)
c  in CNF:
c    -b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨  b^{358, 2}_2
c    -b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_1
c    -b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨  b^{358, 2}_0
c  in DIMACS:
-24209 -24210  24211 -358  24212 0
-24209 -24210  24211 -358 -24213 0
-24209 -24210  24211 -358  24214 0

c  -1+1 --> 0
c    ( b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧  b^{358, 1}_0 ∧  p_358) -> (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧ -b^{358, 2}_0)
c  in CNF:
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_2
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_1
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_0
c  in DIMACS:
-24209  24210 -24211 -358 -24212 0
-24209  24210 -24211 -358 -24213 0
-24209  24210 -24211 -358 -24214 0

c  0+1 --> 1
c    (-b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧  p_358) -> (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0)
c  in CNF:
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_2
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_1
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨  b^{358, 2}_0
c  in DIMACS:
 24209  24210  24211 -358 -24212 0
 24209  24210  24211 -358 -24213 0
 24209  24210  24211 -358  24214 0

c  1+1 --> 2
c    (-b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧  b^{358, 1}_0 ∧  p_358) -> (-b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0)
c  in CNF:
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_2
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨  b^{358, 2}_1
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ -p_358 ∨ -b^{358, 2}_0
c  in DIMACS:
 24209  24210 -24211 -358 -24212 0
 24209  24210 -24211 -358  24213 0
 24209  24210 -24211 -358 -24214 0

c  2+1 --> break 
c    (-b^{358, 1}_2 ∧  b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧  p_358) -> break
c  in CNF:
c     b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ -p_358 ∨ break
c  in DIMACS:
 24209 -24210  24211 -358 1162 0


c  2-1 --> 1
c    (-b^{358, 1}_2 ∧  b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧ -p_358) -> (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0)
c  in CNF:
c     b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_2
c     b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_1
c     b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨  b^{358, 2}_0
c  in DIMACS:
 24209 -24210  24211  358 -24212 0
 24209 -24210  24211  358 -24213 0
 24209 -24210  24211  358  24214 0

c  1-1 --> 0
c    (-b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧  b^{358, 1}_0 ∧ -p_358) -> (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧ -b^{358, 2}_0)
c  in CNF:
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_2
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_1
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_0
c  in DIMACS:
 24209  24210 -24211  358 -24212 0
 24209  24210 -24211  358 -24213 0
 24209  24210 -24211  358 -24214 0

c  0-1 --> -1
c    (-b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧ -p_358) -> ( b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0)
c  in CNF:
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨  b^{358, 2}_2
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_1
c     b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨  b^{358, 2}_0
c  in DIMACS:
 24209  24210  24211  358  24212 0
 24209  24210  24211  358 -24213 0
 24209  24210  24211  358  24214 0

c  -1-1 --> -2
c    ( b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧  b^{358, 1}_0 ∧ -p_358) -> ( b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0)
c  in CNF:
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨  b^{358, 2}_2
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨  b^{358, 2}_1
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨  p_358 ∨ -b^{358, 2}_0
c  in DIMACS:
-24209  24210 -24211  358  24212 0
-24209  24210 -24211  358  24213 0
-24209  24210 -24211  358 -24214 0

c  -2-1 --> break 
c    ( b^{358, 1}_2 ∧  b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧ -p_358) -> break
c  in CNF:
c    -b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨  b^{358, 1}_0 ∨  p_358 ∨ break
c  in DIMACS:
-24209 -24210  24211  358 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{358, 1}_2 ∧ -b^{358, 1}_1 ∧ -b^{358, 1}_0 ∧ true) 
c  in CNF:
c    -b^{358, 1}_2 ∨  b^{358, 1}_1 ∨  b^{358, 1}_0 ∨ false 
c  in DIMACS:
-24209  24210  24211  0

c  3 does not represent an automaton state.
c    -(-b^{358, 1}_2 ∧  b^{358, 1}_1 ∧  b^{358, 1}_0 ∧ true) 
c  in CNF:
c     b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ false 
c  in DIMACS:
 24209 -24210 -24211  0
c  -3 does not represent an automaton state.
c    -( b^{358, 1}_2 ∧  b^{358, 1}_1 ∧  b^{358, 1}_0 ∧ true) 
c  in CNF:
c    -b^{358, 1}_2 ∨ -b^{358, 1}_1 ∨ -b^{358, 1}_0 ∨ false 
c  in DIMACS:
-24209 -24210 -24211  0

c i = 2
c  -2+1 --> -1
c    ( b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧  p_716) -> ( b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0)
c  in CNF:
c    -b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨  b^{358, 3}_2
c    -b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_1
c    -b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨  b^{358, 3}_0
c  in DIMACS:
-24212 -24213  24214 -716  24215 0
-24212 -24213  24214 -716 -24216 0
-24212 -24213  24214 -716  24217 0

c  -1+1 --> 0
c    ( b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0 ∧  p_716) -> (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧ -b^{358, 3}_0)
c  in CNF:
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_2
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_1
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_0
c  in DIMACS:
-24212  24213 -24214 -716 -24215 0
-24212  24213 -24214 -716 -24216 0
-24212  24213 -24214 -716 -24217 0

c  0+1 --> 1
c    (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧  p_716) -> (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0)
c  in CNF:
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_2
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_1
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨  b^{358, 3}_0
c  in DIMACS:
 24212  24213  24214 -716 -24215 0
 24212  24213  24214 -716 -24216 0
 24212  24213  24214 -716  24217 0

c  1+1 --> 2
c    (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0 ∧  p_716) -> (-b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0)
c  in CNF:
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_2
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨  b^{358, 3}_1
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ -p_716 ∨ -b^{358, 3}_0
c  in DIMACS:
 24212  24213 -24214 -716 -24215 0
 24212  24213 -24214 -716  24216 0
 24212  24213 -24214 -716 -24217 0

c  2+1 --> break 
c    (-b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧  p_716) -> break
c  in CNF:
c     b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ -p_716 ∨ break
c  in DIMACS:
 24212 -24213  24214 -716 1162 0


c  2-1 --> 1
c    (-b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧ -p_716) -> (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0)
c  in CNF:
c     b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_2
c     b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_1
c     b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨  b^{358, 3}_0
c  in DIMACS:
 24212 -24213  24214  716 -24215 0
 24212 -24213  24214  716 -24216 0
 24212 -24213  24214  716  24217 0

c  1-1 --> 0
c    (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0 ∧ -p_716) -> (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧ -b^{358, 3}_0)
c  in CNF:
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_2
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_1
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_0
c  in DIMACS:
 24212  24213 -24214  716 -24215 0
 24212  24213 -24214  716 -24216 0
 24212  24213 -24214  716 -24217 0

c  0-1 --> -1
c    (-b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧ -p_716) -> ( b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0)
c  in CNF:
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨  b^{358, 3}_2
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_1
c     b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨  b^{358, 3}_0
c  in DIMACS:
 24212  24213  24214  716  24215 0
 24212  24213  24214  716 -24216 0
 24212  24213  24214  716  24217 0

c  -1-1 --> -2
c    ( b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧  b^{358, 2}_0 ∧ -p_716) -> ( b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0)
c  in CNF:
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨  b^{358, 3}_2
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨  b^{358, 3}_1
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨  p_716 ∨ -b^{358, 3}_0
c  in DIMACS:
-24212  24213 -24214  716  24215 0
-24212  24213 -24214  716  24216 0
-24212  24213 -24214  716 -24217 0

c  -2-1 --> break 
c    ( b^{358, 2}_2 ∧  b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧ -p_716) -> break
c  in CNF:
c    -b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨  b^{358, 2}_0 ∨  p_716 ∨ break
c  in DIMACS:
-24212 -24213  24214  716 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{358, 2}_2 ∧ -b^{358, 2}_1 ∧ -b^{358, 2}_0 ∧ true) 
c  in CNF:
c    -b^{358, 2}_2 ∨  b^{358, 2}_1 ∨  b^{358, 2}_0 ∨ false 
c  in DIMACS:
-24212  24213  24214  0

c  3 does not represent an automaton state.
c    -(-b^{358, 2}_2 ∧  b^{358, 2}_1 ∧  b^{358, 2}_0 ∧ true) 
c  in CNF:
c     b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ false 
c  in DIMACS:
 24212 -24213 -24214  0
c  -3 does not represent an automaton state.
c    -( b^{358, 2}_2 ∧  b^{358, 2}_1 ∧  b^{358, 2}_0 ∧ true) 
c  in CNF:
c    -b^{358, 2}_2 ∨ -b^{358, 2}_1 ∨ -b^{358, 2}_0 ∨ false 
c  in DIMACS:
-24212 -24213 -24214  0

c i = 3
c  -2+1 --> -1
c    ( b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧  p_1074) -> ( b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧  b^{358, 4}_0)
c  in CNF:
c    -b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨  b^{358, 4}_2
c    -b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_1
c    -b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨  b^{358, 4}_0
c  in DIMACS:
-24215 -24216  24217 -1074  24218 0
-24215 -24216  24217 -1074 -24219 0
-24215 -24216  24217 -1074  24220 0

c  -1+1 --> 0
c    ( b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0 ∧  p_1074) -> (-b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧ -b^{358, 4}_0)
c  in CNF:
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_2
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_1
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_0
c  in DIMACS:
-24215  24216 -24217 -1074 -24218 0
-24215  24216 -24217 -1074 -24219 0
-24215  24216 -24217 -1074 -24220 0

c  0+1 --> 1
c    (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧  p_1074) -> (-b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧  b^{358, 4}_0)
c  in CNF:
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_2
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_1
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨  b^{358, 4}_0
c  in DIMACS:
 24215  24216  24217 -1074 -24218 0
 24215  24216  24217 -1074 -24219 0
 24215  24216  24217 -1074  24220 0

c  1+1 --> 2
c    (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0 ∧  p_1074) -> (-b^{358, 4}_2 ∧  b^{358, 4}_1 ∧ -b^{358, 4}_0)
c  in CNF:
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_2
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨  b^{358, 4}_1
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ -p_1074 ∨ -b^{358, 4}_0
c  in DIMACS:
 24215  24216 -24217 -1074 -24218 0
 24215  24216 -24217 -1074  24219 0
 24215  24216 -24217 -1074 -24220 0

c  2+1 --> break 
c    (-b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧  p_1074) -> break
c  in CNF:
c     b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ -p_1074 ∨ break
c  in DIMACS:
 24215 -24216  24217 -1074 1162 0


c  2-1 --> 1
c    (-b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧ -p_1074) -> (-b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧  b^{358, 4}_0)
c  in CNF:
c     b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_2
c     b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_1
c     b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨  b^{358, 4}_0
c  in DIMACS:
 24215 -24216  24217  1074 -24218 0
 24215 -24216  24217  1074 -24219 0
 24215 -24216  24217  1074  24220 0

c  1-1 --> 0
c    (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0 ∧ -p_1074) -> (-b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧ -b^{358, 4}_0)
c  in CNF:
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_2
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_1
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_0
c  in DIMACS:
 24215  24216 -24217  1074 -24218 0
 24215  24216 -24217  1074 -24219 0
 24215  24216 -24217  1074 -24220 0

c  0-1 --> -1
c    (-b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧ -p_1074) -> ( b^{358, 4}_2 ∧ -b^{358, 4}_1 ∧  b^{358, 4}_0)
c  in CNF:
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨  b^{358, 4}_2
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_1
c     b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨  b^{358, 4}_0
c  in DIMACS:
 24215  24216  24217  1074  24218 0
 24215  24216  24217  1074 -24219 0
 24215  24216  24217  1074  24220 0

c  -1-1 --> -2
c    ( b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧  b^{358, 3}_0 ∧ -p_1074) -> ( b^{358, 4}_2 ∧  b^{358, 4}_1 ∧ -b^{358, 4}_0)
c  in CNF:
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨  b^{358, 4}_2
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨  b^{358, 4}_1
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨  p_1074 ∨ -b^{358, 4}_0
c  in DIMACS:
-24215  24216 -24217  1074  24218 0
-24215  24216 -24217  1074  24219 0
-24215  24216 -24217  1074 -24220 0

c  -2-1 --> break 
c    ( b^{358, 3}_2 ∧  b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧ -p_1074) -> break
c  in CNF:
c    -b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨  b^{358, 3}_0 ∨  p_1074 ∨ break
c  in DIMACS:
-24215 -24216  24217  1074 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{358, 3}_2 ∧ -b^{358, 3}_1 ∧ -b^{358, 3}_0 ∧ true) 
c  in CNF:
c    -b^{358, 3}_2 ∨  b^{358, 3}_1 ∨  b^{358, 3}_0 ∨ false 
c  in DIMACS:
-24215  24216  24217  0

c  3 does not represent an automaton state.
c    -(-b^{358, 3}_2 ∧  b^{358, 3}_1 ∧  b^{358, 3}_0 ∧ true) 
c  in CNF:
c     b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ false 
c  in DIMACS:
 24215 -24216 -24217  0
c  -3 does not represent an automaton state.
c    -( b^{358, 3}_2 ∧  b^{358, 3}_1 ∧  b^{358, 3}_0 ∧ true) 
c  in CNF:
c    -b^{358, 3}_2 ∨ -b^{358, 3}_1 ∨ -b^{358, 3}_0 ∨ false 
c  in DIMACS:
-24215 -24216 -24217  0

c INIT for k = 359
c    -b^{359, 1}_2
c    -b^{359, 1}_1
c    -b^{359, 1}_0
c  in DIMACS:
-24221 0
-24222 0
-24223 0

c Transitions for k = 359
c i = 1
c  -2+1 --> -1
c    ( b^{359, 1}_2 ∧  b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧  p_359) -> ( b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0)
c  in CNF:
c    -b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨  b^{359, 2}_2
c    -b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_1
c    -b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨  b^{359, 2}_0
c  in DIMACS:
-24221 -24222  24223 -359  24224 0
-24221 -24222  24223 -359 -24225 0
-24221 -24222  24223 -359  24226 0

c  -1+1 --> 0
c    ( b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧  b^{359, 1}_0 ∧  p_359) -> (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧ -b^{359, 2}_0)
c  in CNF:
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_2
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_1
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_0
c  in DIMACS:
-24221  24222 -24223 -359 -24224 0
-24221  24222 -24223 -359 -24225 0
-24221  24222 -24223 -359 -24226 0

c  0+1 --> 1
c    (-b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧  p_359) -> (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0)
c  in CNF:
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_2
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_1
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨  b^{359, 2}_0
c  in DIMACS:
 24221  24222  24223 -359 -24224 0
 24221  24222  24223 -359 -24225 0
 24221  24222  24223 -359  24226 0

c  1+1 --> 2
c    (-b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧  b^{359, 1}_0 ∧  p_359) -> (-b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0)
c  in CNF:
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_2
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨  b^{359, 2}_1
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ -p_359 ∨ -b^{359, 2}_0
c  in DIMACS:
 24221  24222 -24223 -359 -24224 0
 24221  24222 -24223 -359  24225 0
 24221  24222 -24223 -359 -24226 0

c  2+1 --> break 
c    (-b^{359, 1}_2 ∧  b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧  p_359) -> break
c  in CNF:
c     b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ -p_359 ∨ break
c  in DIMACS:
 24221 -24222  24223 -359 1162 0


c  2-1 --> 1
c    (-b^{359, 1}_2 ∧  b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧ -p_359) -> (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0)
c  in CNF:
c     b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_2
c     b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_1
c     b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨  b^{359, 2}_0
c  in DIMACS:
 24221 -24222  24223  359 -24224 0
 24221 -24222  24223  359 -24225 0
 24221 -24222  24223  359  24226 0

c  1-1 --> 0
c    (-b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧  b^{359, 1}_0 ∧ -p_359) -> (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧ -b^{359, 2}_0)
c  in CNF:
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_2
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_1
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_0
c  in DIMACS:
 24221  24222 -24223  359 -24224 0
 24221  24222 -24223  359 -24225 0
 24221  24222 -24223  359 -24226 0

c  0-1 --> -1
c    (-b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧ -p_359) -> ( b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0)
c  in CNF:
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨  b^{359, 2}_2
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_1
c     b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨  b^{359, 2}_0
c  in DIMACS:
 24221  24222  24223  359  24224 0
 24221  24222  24223  359 -24225 0
 24221  24222  24223  359  24226 0

c  -1-1 --> -2
c    ( b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧  b^{359, 1}_0 ∧ -p_359) -> ( b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0)
c  in CNF:
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨  b^{359, 2}_2
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨  b^{359, 2}_1
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨  p_359 ∨ -b^{359, 2}_0
c  in DIMACS:
-24221  24222 -24223  359  24224 0
-24221  24222 -24223  359  24225 0
-24221  24222 -24223  359 -24226 0

c  -2-1 --> break 
c    ( b^{359, 1}_2 ∧  b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧ -p_359) -> break
c  in CNF:
c    -b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨  b^{359, 1}_0 ∨  p_359 ∨ break
c  in DIMACS:
-24221 -24222  24223  359 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{359, 1}_2 ∧ -b^{359, 1}_1 ∧ -b^{359, 1}_0 ∧ true) 
c  in CNF:
c    -b^{359, 1}_2 ∨  b^{359, 1}_1 ∨  b^{359, 1}_0 ∨ false 
c  in DIMACS:
-24221  24222  24223  0

c  3 does not represent an automaton state.
c    -(-b^{359, 1}_2 ∧  b^{359, 1}_1 ∧  b^{359, 1}_0 ∧ true) 
c  in CNF:
c     b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ false 
c  in DIMACS:
 24221 -24222 -24223  0
c  -3 does not represent an automaton state.
c    -( b^{359, 1}_2 ∧  b^{359, 1}_1 ∧  b^{359, 1}_0 ∧ true) 
c  in CNF:
c    -b^{359, 1}_2 ∨ -b^{359, 1}_1 ∨ -b^{359, 1}_0 ∨ false 
c  in DIMACS:
-24221 -24222 -24223  0

c i = 2
c  -2+1 --> -1
c    ( b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧  p_718) -> ( b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0)
c  in CNF:
c    -b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨  b^{359, 3}_2
c    -b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_1
c    -b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨  b^{359, 3}_0
c  in DIMACS:
-24224 -24225  24226 -718  24227 0
-24224 -24225  24226 -718 -24228 0
-24224 -24225  24226 -718  24229 0

c  -1+1 --> 0
c    ( b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0 ∧  p_718) -> (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧ -b^{359, 3}_0)
c  in CNF:
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_2
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_1
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_0
c  in DIMACS:
-24224  24225 -24226 -718 -24227 0
-24224  24225 -24226 -718 -24228 0
-24224  24225 -24226 -718 -24229 0

c  0+1 --> 1
c    (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧  p_718) -> (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0)
c  in CNF:
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_2
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_1
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨  b^{359, 3}_0
c  in DIMACS:
 24224  24225  24226 -718 -24227 0
 24224  24225  24226 -718 -24228 0
 24224  24225  24226 -718  24229 0

c  1+1 --> 2
c    (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0 ∧  p_718) -> (-b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0)
c  in CNF:
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_2
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨  b^{359, 3}_1
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ -p_718 ∨ -b^{359, 3}_0
c  in DIMACS:
 24224  24225 -24226 -718 -24227 0
 24224  24225 -24226 -718  24228 0
 24224  24225 -24226 -718 -24229 0

c  2+1 --> break 
c    (-b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧  p_718) -> break
c  in CNF:
c     b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ -p_718 ∨ break
c  in DIMACS:
 24224 -24225  24226 -718 1162 0


c  2-1 --> 1
c    (-b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧ -p_718) -> (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0)
c  in CNF:
c     b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_2
c     b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_1
c     b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨  b^{359, 3}_0
c  in DIMACS:
 24224 -24225  24226  718 -24227 0
 24224 -24225  24226  718 -24228 0
 24224 -24225  24226  718  24229 0

c  1-1 --> 0
c    (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0 ∧ -p_718) -> (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧ -b^{359, 3}_0)
c  in CNF:
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_2
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_1
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_0
c  in DIMACS:
 24224  24225 -24226  718 -24227 0
 24224  24225 -24226  718 -24228 0
 24224  24225 -24226  718 -24229 0

c  0-1 --> -1
c    (-b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧ -p_718) -> ( b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0)
c  in CNF:
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨  b^{359, 3}_2
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_1
c     b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨  b^{359, 3}_0
c  in DIMACS:
 24224  24225  24226  718  24227 0
 24224  24225  24226  718 -24228 0
 24224  24225  24226  718  24229 0

c  -1-1 --> -2
c    ( b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧  b^{359, 2}_0 ∧ -p_718) -> ( b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0)
c  in CNF:
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨  b^{359, 3}_2
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨  b^{359, 3}_1
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨  p_718 ∨ -b^{359, 3}_0
c  in DIMACS:
-24224  24225 -24226  718  24227 0
-24224  24225 -24226  718  24228 0
-24224  24225 -24226  718 -24229 0

c  -2-1 --> break 
c    ( b^{359, 2}_2 ∧  b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧ -p_718) -> break
c  in CNF:
c    -b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨  b^{359, 2}_0 ∨  p_718 ∨ break
c  in DIMACS:
-24224 -24225  24226  718 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{359, 2}_2 ∧ -b^{359, 2}_1 ∧ -b^{359, 2}_0 ∧ true) 
c  in CNF:
c    -b^{359, 2}_2 ∨  b^{359, 2}_1 ∨  b^{359, 2}_0 ∨ false 
c  in DIMACS:
-24224  24225  24226  0

c  3 does not represent an automaton state.
c    -(-b^{359, 2}_2 ∧  b^{359, 2}_1 ∧  b^{359, 2}_0 ∧ true) 
c  in CNF:
c     b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ false 
c  in DIMACS:
 24224 -24225 -24226  0
c  -3 does not represent an automaton state.
c    -( b^{359, 2}_2 ∧  b^{359, 2}_1 ∧  b^{359, 2}_0 ∧ true) 
c  in CNF:
c    -b^{359, 2}_2 ∨ -b^{359, 2}_1 ∨ -b^{359, 2}_0 ∨ false 
c  in DIMACS:
-24224 -24225 -24226  0

c i = 3
c  -2+1 --> -1
c    ( b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧  p_1077) -> ( b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧  b^{359, 4}_0)
c  in CNF:
c    -b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨  b^{359, 4}_2
c    -b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_1
c    -b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨  b^{359, 4}_0
c  in DIMACS:
-24227 -24228  24229 -1077  24230 0
-24227 -24228  24229 -1077 -24231 0
-24227 -24228  24229 -1077  24232 0

c  -1+1 --> 0
c    ( b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0 ∧  p_1077) -> (-b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧ -b^{359, 4}_0)
c  in CNF:
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_2
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_1
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_0
c  in DIMACS:
-24227  24228 -24229 -1077 -24230 0
-24227  24228 -24229 -1077 -24231 0
-24227  24228 -24229 -1077 -24232 0

c  0+1 --> 1
c    (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧  p_1077) -> (-b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧  b^{359, 4}_0)
c  in CNF:
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_2
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_1
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨  b^{359, 4}_0
c  in DIMACS:
 24227  24228  24229 -1077 -24230 0
 24227  24228  24229 -1077 -24231 0
 24227  24228  24229 -1077  24232 0

c  1+1 --> 2
c    (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0 ∧  p_1077) -> (-b^{359, 4}_2 ∧  b^{359, 4}_1 ∧ -b^{359, 4}_0)
c  in CNF:
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_2
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨  b^{359, 4}_1
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ -p_1077 ∨ -b^{359, 4}_0
c  in DIMACS:
 24227  24228 -24229 -1077 -24230 0
 24227  24228 -24229 -1077  24231 0
 24227  24228 -24229 -1077 -24232 0

c  2+1 --> break 
c    (-b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧  p_1077) -> break
c  in CNF:
c     b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ -p_1077 ∨ break
c  in DIMACS:
 24227 -24228  24229 -1077 1162 0


c  2-1 --> 1
c    (-b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧ -p_1077) -> (-b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧  b^{359, 4}_0)
c  in CNF:
c     b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_2
c     b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_1
c     b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨  b^{359, 4}_0
c  in DIMACS:
 24227 -24228  24229  1077 -24230 0
 24227 -24228  24229  1077 -24231 0
 24227 -24228  24229  1077  24232 0

c  1-1 --> 0
c    (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0 ∧ -p_1077) -> (-b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧ -b^{359, 4}_0)
c  in CNF:
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_2
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_1
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_0
c  in DIMACS:
 24227  24228 -24229  1077 -24230 0
 24227  24228 -24229  1077 -24231 0
 24227  24228 -24229  1077 -24232 0

c  0-1 --> -1
c    (-b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧ -p_1077) -> ( b^{359, 4}_2 ∧ -b^{359, 4}_1 ∧  b^{359, 4}_0)
c  in CNF:
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨  b^{359, 4}_2
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_1
c     b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨  b^{359, 4}_0
c  in DIMACS:
 24227  24228  24229  1077  24230 0
 24227  24228  24229  1077 -24231 0
 24227  24228  24229  1077  24232 0

c  -1-1 --> -2
c    ( b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧  b^{359, 3}_0 ∧ -p_1077) -> ( b^{359, 4}_2 ∧  b^{359, 4}_1 ∧ -b^{359, 4}_0)
c  in CNF:
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨  b^{359, 4}_2
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨  b^{359, 4}_1
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨  p_1077 ∨ -b^{359, 4}_0
c  in DIMACS:
-24227  24228 -24229  1077  24230 0
-24227  24228 -24229  1077  24231 0
-24227  24228 -24229  1077 -24232 0

c  -2-1 --> break 
c    ( b^{359, 3}_2 ∧  b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧ -p_1077) -> break
c  in CNF:
c    -b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨  b^{359, 3}_0 ∨  p_1077 ∨ break
c  in DIMACS:
-24227 -24228  24229  1077 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{359, 3}_2 ∧ -b^{359, 3}_1 ∧ -b^{359, 3}_0 ∧ true) 
c  in CNF:
c    -b^{359, 3}_2 ∨  b^{359, 3}_1 ∨  b^{359, 3}_0 ∨ false 
c  in DIMACS:
-24227  24228  24229  0

c  3 does not represent an automaton state.
c    -(-b^{359, 3}_2 ∧  b^{359, 3}_1 ∧  b^{359, 3}_0 ∧ true) 
c  in CNF:
c     b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ false 
c  in DIMACS:
 24227 -24228 -24229  0
c  -3 does not represent an automaton state.
c    -( b^{359, 3}_2 ∧  b^{359, 3}_1 ∧  b^{359, 3}_0 ∧ true) 
c  in CNF:
c    -b^{359, 3}_2 ∨ -b^{359, 3}_1 ∨ -b^{359, 3}_0 ∨ false 
c  in DIMACS:
-24227 -24228 -24229  0

c INIT for k = 360
c    -b^{360, 1}_2
c    -b^{360, 1}_1
c    -b^{360, 1}_0
c  in DIMACS:
-24233 0
-24234 0
-24235 0

c Transitions for k = 360
c i = 1
c  -2+1 --> -1
c    ( b^{360, 1}_2 ∧  b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧  p_360) -> ( b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0)
c  in CNF:
c    -b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨  b^{360, 2}_2
c    -b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_1
c    -b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨  b^{360, 2}_0
c  in DIMACS:
-24233 -24234  24235 -360  24236 0
-24233 -24234  24235 -360 -24237 0
-24233 -24234  24235 -360  24238 0

c  -1+1 --> 0
c    ( b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧  b^{360, 1}_0 ∧  p_360) -> (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧ -b^{360, 2}_0)
c  in CNF:
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_2
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_1
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_0
c  in DIMACS:
-24233  24234 -24235 -360 -24236 0
-24233  24234 -24235 -360 -24237 0
-24233  24234 -24235 -360 -24238 0

c  0+1 --> 1
c    (-b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧  p_360) -> (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0)
c  in CNF:
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_2
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_1
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨  b^{360, 2}_0
c  in DIMACS:
 24233  24234  24235 -360 -24236 0
 24233  24234  24235 -360 -24237 0
 24233  24234  24235 -360  24238 0

c  1+1 --> 2
c    (-b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧  b^{360, 1}_0 ∧  p_360) -> (-b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0)
c  in CNF:
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_2
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨  b^{360, 2}_1
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ -p_360 ∨ -b^{360, 2}_0
c  in DIMACS:
 24233  24234 -24235 -360 -24236 0
 24233  24234 -24235 -360  24237 0
 24233  24234 -24235 -360 -24238 0

c  2+1 --> break 
c    (-b^{360, 1}_2 ∧  b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧  p_360) -> break
c  in CNF:
c     b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ -p_360 ∨ break
c  in DIMACS:
 24233 -24234  24235 -360 1162 0


c  2-1 --> 1
c    (-b^{360, 1}_2 ∧  b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧ -p_360) -> (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0)
c  in CNF:
c     b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_2
c     b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_1
c     b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨  b^{360, 2}_0
c  in DIMACS:
 24233 -24234  24235  360 -24236 0
 24233 -24234  24235  360 -24237 0
 24233 -24234  24235  360  24238 0

c  1-1 --> 0
c    (-b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧  b^{360, 1}_0 ∧ -p_360) -> (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧ -b^{360, 2}_0)
c  in CNF:
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_2
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_1
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_0
c  in DIMACS:
 24233  24234 -24235  360 -24236 0
 24233  24234 -24235  360 -24237 0
 24233  24234 -24235  360 -24238 0

c  0-1 --> -1
c    (-b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧ -p_360) -> ( b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0)
c  in CNF:
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨  b^{360, 2}_2
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_1
c     b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨  b^{360, 2}_0
c  in DIMACS:
 24233  24234  24235  360  24236 0
 24233  24234  24235  360 -24237 0
 24233  24234  24235  360  24238 0

c  -1-1 --> -2
c    ( b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧  b^{360, 1}_0 ∧ -p_360) -> ( b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0)
c  in CNF:
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨  b^{360, 2}_2
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨  b^{360, 2}_1
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨  p_360 ∨ -b^{360, 2}_0
c  in DIMACS:
-24233  24234 -24235  360  24236 0
-24233  24234 -24235  360  24237 0
-24233  24234 -24235  360 -24238 0

c  -2-1 --> break 
c    ( b^{360, 1}_2 ∧  b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧ -p_360) -> break
c  in CNF:
c    -b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨  b^{360, 1}_0 ∨  p_360 ∨ break
c  in DIMACS:
-24233 -24234  24235  360 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{360, 1}_2 ∧ -b^{360, 1}_1 ∧ -b^{360, 1}_0 ∧ true) 
c  in CNF:
c    -b^{360, 1}_2 ∨  b^{360, 1}_1 ∨  b^{360, 1}_0 ∨ false 
c  in DIMACS:
-24233  24234  24235  0

c  3 does not represent an automaton state.
c    -(-b^{360, 1}_2 ∧  b^{360, 1}_1 ∧  b^{360, 1}_0 ∧ true) 
c  in CNF:
c     b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ false 
c  in DIMACS:
 24233 -24234 -24235  0
c  -3 does not represent an automaton state.
c    -( b^{360, 1}_2 ∧  b^{360, 1}_1 ∧  b^{360, 1}_0 ∧ true) 
c  in CNF:
c    -b^{360, 1}_2 ∨ -b^{360, 1}_1 ∨ -b^{360, 1}_0 ∨ false 
c  in DIMACS:
-24233 -24234 -24235  0

c i = 2
c  -2+1 --> -1
c    ( b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧  p_720) -> ( b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0)
c  in CNF:
c    -b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨  b^{360, 3}_2
c    -b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_1
c    -b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨  b^{360, 3}_0
c  in DIMACS:
-24236 -24237  24238 -720  24239 0
-24236 -24237  24238 -720 -24240 0
-24236 -24237  24238 -720  24241 0

c  -1+1 --> 0
c    ( b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0 ∧  p_720) -> (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧ -b^{360, 3}_0)
c  in CNF:
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_2
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_1
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_0
c  in DIMACS:
-24236  24237 -24238 -720 -24239 0
-24236  24237 -24238 -720 -24240 0
-24236  24237 -24238 -720 -24241 0

c  0+1 --> 1
c    (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧  p_720) -> (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0)
c  in CNF:
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_2
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_1
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨  b^{360, 3}_0
c  in DIMACS:
 24236  24237  24238 -720 -24239 0
 24236  24237  24238 -720 -24240 0
 24236  24237  24238 -720  24241 0

c  1+1 --> 2
c    (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0 ∧  p_720) -> (-b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0)
c  in CNF:
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_2
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨  b^{360, 3}_1
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ -p_720 ∨ -b^{360, 3}_0
c  in DIMACS:
 24236  24237 -24238 -720 -24239 0
 24236  24237 -24238 -720  24240 0
 24236  24237 -24238 -720 -24241 0

c  2+1 --> break 
c    (-b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧  p_720) -> break
c  in CNF:
c     b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ -p_720 ∨ break
c  in DIMACS:
 24236 -24237  24238 -720 1162 0


c  2-1 --> 1
c    (-b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧ -p_720) -> (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0)
c  in CNF:
c     b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_2
c     b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_1
c     b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨  b^{360, 3}_0
c  in DIMACS:
 24236 -24237  24238  720 -24239 0
 24236 -24237  24238  720 -24240 0
 24236 -24237  24238  720  24241 0

c  1-1 --> 0
c    (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0 ∧ -p_720) -> (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧ -b^{360, 3}_0)
c  in CNF:
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_2
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_1
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_0
c  in DIMACS:
 24236  24237 -24238  720 -24239 0
 24236  24237 -24238  720 -24240 0
 24236  24237 -24238  720 -24241 0

c  0-1 --> -1
c    (-b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧ -p_720) -> ( b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0)
c  in CNF:
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨  b^{360, 3}_2
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_1
c     b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨  b^{360, 3}_0
c  in DIMACS:
 24236  24237  24238  720  24239 0
 24236  24237  24238  720 -24240 0
 24236  24237  24238  720  24241 0

c  -1-1 --> -2
c    ( b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧  b^{360, 2}_0 ∧ -p_720) -> ( b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0)
c  in CNF:
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨  b^{360, 3}_2
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨  b^{360, 3}_1
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨  p_720 ∨ -b^{360, 3}_0
c  in DIMACS:
-24236  24237 -24238  720  24239 0
-24236  24237 -24238  720  24240 0
-24236  24237 -24238  720 -24241 0

c  -2-1 --> break 
c    ( b^{360, 2}_2 ∧  b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧ -p_720) -> break
c  in CNF:
c    -b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨  b^{360, 2}_0 ∨  p_720 ∨ break
c  in DIMACS:
-24236 -24237  24238  720 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{360, 2}_2 ∧ -b^{360, 2}_1 ∧ -b^{360, 2}_0 ∧ true) 
c  in CNF:
c    -b^{360, 2}_2 ∨  b^{360, 2}_1 ∨  b^{360, 2}_0 ∨ false 
c  in DIMACS:
-24236  24237  24238  0

c  3 does not represent an automaton state.
c    -(-b^{360, 2}_2 ∧  b^{360, 2}_1 ∧  b^{360, 2}_0 ∧ true) 
c  in CNF:
c     b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ false 
c  in DIMACS:
 24236 -24237 -24238  0
c  -3 does not represent an automaton state.
c    -( b^{360, 2}_2 ∧  b^{360, 2}_1 ∧  b^{360, 2}_0 ∧ true) 
c  in CNF:
c    -b^{360, 2}_2 ∨ -b^{360, 2}_1 ∨ -b^{360, 2}_0 ∨ false 
c  in DIMACS:
-24236 -24237 -24238  0

c i = 3
c  -2+1 --> -1
c    ( b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧  p_1080) -> ( b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧  b^{360, 4}_0)
c  in CNF:
c    -b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨  b^{360, 4}_2
c    -b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_1
c    -b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨  b^{360, 4}_0
c  in DIMACS:
-24239 -24240  24241 -1080  24242 0
-24239 -24240  24241 -1080 -24243 0
-24239 -24240  24241 -1080  24244 0

c  -1+1 --> 0
c    ( b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0 ∧  p_1080) -> (-b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧ -b^{360, 4}_0)
c  in CNF:
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_2
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_1
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_0
c  in DIMACS:
-24239  24240 -24241 -1080 -24242 0
-24239  24240 -24241 -1080 -24243 0
-24239  24240 -24241 -1080 -24244 0

c  0+1 --> 1
c    (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧  p_1080) -> (-b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧  b^{360, 4}_0)
c  in CNF:
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_2
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_1
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨  b^{360, 4}_0
c  in DIMACS:
 24239  24240  24241 -1080 -24242 0
 24239  24240  24241 -1080 -24243 0
 24239  24240  24241 -1080  24244 0

c  1+1 --> 2
c    (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0 ∧  p_1080) -> (-b^{360, 4}_2 ∧  b^{360, 4}_1 ∧ -b^{360, 4}_0)
c  in CNF:
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_2
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨  b^{360, 4}_1
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ -p_1080 ∨ -b^{360, 4}_0
c  in DIMACS:
 24239  24240 -24241 -1080 -24242 0
 24239  24240 -24241 -1080  24243 0
 24239  24240 -24241 -1080 -24244 0

c  2+1 --> break 
c    (-b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧  p_1080) -> break
c  in CNF:
c     b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ -p_1080 ∨ break
c  in DIMACS:
 24239 -24240  24241 -1080 1162 0


c  2-1 --> 1
c    (-b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧ -p_1080) -> (-b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧  b^{360, 4}_0)
c  in CNF:
c     b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_2
c     b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_1
c     b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨  b^{360, 4}_0
c  in DIMACS:
 24239 -24240  24241  1080 -24242 0
 24239 -24240  24241  1080 -24243 0
 24239 -24240  24241  1080  24244 0

c  1-1 --> 0
c    (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0 ∧ -p_1080) -> (-b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧ -b^{360, 4}_0)
c  in CNF:
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_2
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_1
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_0
c  in DIMACS:
 24239  24240 -24241  1080 -24242 0
 24239  24240 -24241  1080 -24243 0
 24239  24240 -24241  1080 -24244 0

c  0-1 --> -1
c    (-b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧ -p_1080) -> ( b^{360, 4}_2 ∧ -b^{360, 4}_1 ∧  b^{360, 4}_0)
c  in CNF:
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨  b^{360, 4}_2
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_1
c     b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨  b^{360, 4}_0
c  in DIMACS:
 24239  24240  24241  1080  24242 0
 24239  24240  24241  1080 -24243 0
 24239  24240  24241  1080  24244 0

c  -1-1 --> -2
c    ( b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧  b^{360, 3}_0 ∧ -p_1080) -> ( b^{360, 4}_2 ∧  b^{360, 4}_1 ∧ -b^{360, 4}_0)
c  in CNF:
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨  b^{360, 4}_2
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨  b^{360, 4}_1
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨  p_1080 ∨ -b^{360, 4}_0
c  in DIMACS:
-24239  24240 -24241  1080  24242 0
-24239  24240 -24241  1080  24243 0
-24239  24240 -24241  1080 -24244 0

c  -2-1 --> break 
c    ( b^{360, 3}_2 ∧  b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧ -p_1080) -> break
c  in CNF:
c    -b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨  b^{360, 3}_0 ∨  p_1080 ∨ break
c  in DIMACS:
-24239 -24240  24241  1080 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{360, 3}_2 ∧ -b^{360, 3}_1 ∧ -b^{360, 3}_0 ∧ true) 
c  in CNF:
c    -b^{360, 3}_2 ∨  b^{360, 3}_1 ∨  b^{360, 3}_0 ∨ false 
c  in DIMACS:
-24239  24240  24241  0

c  3 does not represent an automaton state.
c    -(-b^{360, 3}_2 ∧  b^{360, 3}_1 ∧  b^{360, 3}_0 ∧ true) 
c  in CNF:
c     b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ false 
c  in DIMACS:
 24239 -24240 -24241  0
c  -3 does not represent an automaton state.
c    -( b^{360, 3}_2 ∧  b^{360, 3}_1 ∧  b^{360, 3}_0 ∧ true) 
c  in CNF:
c    -b^{360, 3}_2 ∨ -b^{360, 3}_1 ∨ -b^{360, 3}_0 ∨ false 
c  in DIMACS:
-24239 -24240 -24241  0

c INIT for k = 361
c    -b^{361, 1}_2
c    -b^{361, 1}_1
c    -b^{361, 1}_0
c  in DIMACS:
-24245 0
-24246 0
-24247 0

c Transitions for k = 361
c i = 1
c  -2+1 --> -1
c    ( b^{361, 1}_2 ∧  b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧  p_361) -> ( b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0)
c  in CNF:
c    -b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨  b^{361, 2}_2
c    -b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_1
c    -b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨  b^{361, 2}_0
c  in DIMACS:
-24245 -24246  24247 -361  24248 0
-24245 -24246  24247 -361 -24249 0
-24245 -24246  24247 -361  24250 0

c  -1+1 --> 0
c    ( b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧  b^{361, 1}_0 ∧  p_361) -> (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧ -b^{361, 2}_0)
c  in CNF:
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_2
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_1
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_0
c  in DIMACS:
-24245  24246 -24247 -361 -24248 0
-24245  24246 -24247 -361 -24249 0
-24245  24246 -24247 -361 -24250 0

c  0+1 --> 1
c    (-b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧  p_361) -> (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0)
c  in CNF:
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_2
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_1
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨  b^{361, 2}_0
c  in DIMACS:
 24245  24246  24247 -361 -24248 0
 24245  24246  24247 -361 -24249 0
 24245  24246  24247 -361  24250 0

c  1+1 --> 2
c    (-b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧  b^{361, 1}_0 ∧  p_361) -> (-b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0)
c  in CNF:
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_2
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨  b^{361, 2}_1
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ -p_361 ∨ -b^{361, 2}_0
c  in DIMACS:
 24245  24246 -24247 -361 -24248 0
 24245  24246 -24247 -361  24249 0
 24245  24246 -24247 -361 -24250 0

c  2+1 --> break 
c    (-b^{361, 1}_2 ∧  b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧  p_361) -> break
c  in CNF:
c     b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ -p_361 ∨ break
c  in DIMACS:
 24245 -24246  24247 -361 1162 0


c  2-1 --> 1
c    (-b^{361, 1}_2 ∧  b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧ -p_361) -> (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0)
c  in CNF:
c     b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_2
c     b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_1
c     b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨  b^{361, 2}_0
c  in DIMACS:
 24245 -24246  24247  361 -24248 0
 24245 -24246  24247  361 -24249 0
 24245 -24246  24247  361  24250 0

c  1-1 --> 0
c    (-b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧  b^{361, 1}_0 ∧ -p_361) -> (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧ -b^{361, 2}_0)
c  in CNF:
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_2
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_1
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_0
c  in DIMACS:
 24245  24246 -24247  361 -24248 0
 24245  24246 -24247  361 -24249 0
 24245  24246 -24247  361 -24250 0

c  0-1 --> -1
c    (-b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧ -p_361) -> ( b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0)
c  in CNF:
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨  b^{361, 2}_2
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_1
c     b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨  b^{361, 2}_0
c  in DIMACS:
 24245  24246  24247  361  24248 0
 24245  24246  24247  361 -24249 0
 24245  24246  24247  361  24250 0

c  -1-1 --> -2
c    ( b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧  b^{361, 1}_0 ∧ -p_361) -> ( b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0)
c  in CNF:
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨  b^{361, 2}_2
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨  b^{361, 2}_1
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨  p_361 ∨ -b^{361, 2}_0
c  in DIMACS:
-24245  24246 -24247  361  24248 0
-24245  24246 -24247  361  24249 0
-24245  24246 -24247  361 -24250 0

c  -2-1 --> break 
c    ( b^{361, 1}_2 ∧  b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧ -p_361) -> break
c  in CNF:
c    -b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨  b^{361, 1}_0 ∨  p_361 ∨ break
c  in DIMACS:
-24245 -24246  24247  361 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{361, 1}_2 ∧ -b^{361, 1}_1 ∧ -b^{361, 1}_0 ∧ true) 
c  in CNF:
c    -b^{361, 1}_2 ∨  b^{361, 1}_1 ∨  b^{361, 1}_0 ∨ false 
c  in DIMACS:
-24245  24246  24247  0

c  3 does not represent an automaton state.
c    -(-b^{361, 1}_2 ∧  b^{361, 1}_1 ∧  b^{361, 1}_0 ∧ true) 
c  in CNF:
c     b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ false 
c  in DIMACS:
 24245 -24246 -24247  0
c  -3 does not represent an automaton state.
c    -( b^{361, 1}_2 ∧  b^{361, 1}_1 ∧  b^{361, 1}_0 ∧ true) 
c  in CNF:
c    -b^{361, 1}_2 ∨ -b^{361, 1}_1 ∨ -b^{361, 1}_0 ∨ false 
c  in DIMACS:
-24245 -24246 -24247  0

c i = 2
c  -2+1 --> -1
c    ( b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧  p_722) -> ( b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0)
c  in CNF:
c    -b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨  b^{361, 3}_2
c    -b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_1
c    -b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨  b^{361, 3}_0
c  in DIMACS:
-24248 -24249  24250 -722  24251 0
-24248 -24249  24250 -722 -24252 0
-24248 -24249  24250 -722  24253 0

c  -1+1 --> 0
c    ( b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0 ∧  p_722) -> (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧ -b^{361, 3}_0)
c  in CNF:
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_2
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_1
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_0
c  in DIMACS:
-24248  24249 -24250 -722 -24251 0
-24248  24249 -24250 -722 -24252 0
-24248  24249 -24250 -722 -24253 0

c  0+1 --> 1
c    (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧  p_722) -> (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0)
c  in CNF:
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_2
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_1
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨  b^{361, 3}_0
c  in DIMACS:
 24248  24249  24250 -722 -24251 0
 24248  24249  24250 -722 -24252 0
 24248  24249  24250 -722  24253 0

c  1+1 --> 2
c    (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0 ∧  p_722) -> (-b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0)
c  in CNF:
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_2
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨  b^{361, 3}_1
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ -p_722 ∨ -b^{361, 3}_0
c  in DIMACS:
 24248  24249 -24250 -722 -24251 0
 24248  24249 -24250 -722  24252 0
 24248  24249 -24250 -722 -24253 0

c  2+1 --> break 
c    (-b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧  p_722) -> break
c  in CNF:
c     b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ -p_722 ∨ break
c  in DIMACS:
 24248 -24249  24250 -722 1162 0


c  2-1 --> 1
c    (-b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧ -p_722) -> (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0)
c  in CNF:
c     b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_2
c     b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_1
c     b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨  b^{361, 3}_0
c  in DIMACS:
 24248 -24249  24250  722 -24251 0
 24248 -24249  24250  722 -24252 0
 24248 -24249  24250  722  24253 0

c  1-1 --> 0
c    (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0 ∧ -p_722) -> (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧ -b^{361, 3}_0)
c  in CNF:
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_2
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_1
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_0
c  in DIMACS:
 24248  24249 -24250  722 -24251 0
 24248  24249 -24250  722 -24252 0
 24248  24249 -24250  722 -24253 0

c  0-1 --> -1
c    (-b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧ -p_722) -> ( b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0)
c  in CNF:
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨  b^{361, 3}_2
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_1
c     b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨  b^{361, 3}_0
c  in DIMACS:
 24248  24249  24250  722  24251 0
 24248  24249  24250  722 -24252 0
 24248  24249  24250  722  24253 0

c  -1-1 --> -2
c    ( b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧  b^{361, 2}_0 ∧ -p_722) -> ( b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0)
c  in CNF:
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨  b^{361, 3}_2
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨  b^{361, 3}_1
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨  p_722 ∨ -b^{361, 3}_0
c  in DIMACS:
-24248  24249 -24250  722  24251 0
-24248  24249 -24250  722  24252 0
-24248  24249 -24250  722 -24253 0

c  -2-1 --> break 
c    ( b^{361, 2}_2 ∧  b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧ -p_722) -> break
c  in CNF:
c    -b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨  b^{361, 2}_0 ∨  p_722 ∨ break
c  in DIMACS:
-24248 -24249  24250  722 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{361, 2}_2 ∧ -b^{361, 2}_1 ∧ -b^{361, 2}_0 ∧ true) 
c  in CNF:
c    -b^{361, 2}_2 ∨  b^{361, 2}_1 ∨  b^{361, 2}_0 ∨ false 
c  in DIMACS:
-24248  24249  24250  0

c  3 does not represent an automaton state.
c    -(-b^{361, 2}_2 ∧  b^{361, 2}_1 ∧  b^{361, 2}_0 ∧ true) 
c  in CNF:
c     b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ false 
c  in DIMACS:
 24248 -24249 -24250  0
c  -3 does not represent an automaton state.
c    -( b^{361, 2}_2 ∧  b^{361, 2}_1 ∧  b^{361, 2}_0 ∧ true) 
c  in CNF:
c    -b^{361, 2}_2 ∨ -b^{361, 2}_1 ∨ -b^{361, 2}_0 ∨ false 
c  in DIMACS:
-24248 -24249 -24250  0

c i = 3
c  -2+1 --> -1
c    ( b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧  p_1083) -> ( b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧  b^{361, 4}_0)
c  in CNF:
c    -b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨  b^{361, 4}_2
c    -b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_1
c    -b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨  b^{361, 4}_0
c  in DIMACS:
-24251 -24252  24253 -1083  24254 0
-24251 -24252  24253 -1083 -24255 0
-24251 -24252  24253 -1083  24256 0

c  -1+1 --> 0
c    ( b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0 ∧  p_1083) -> (-b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧ -b^{361, 4}_0)
c  in CNF:
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_2
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_1
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_0
c  in DIMACS:
-24251  24252 -24253 -1083 -24254 0
-24251  24252 -24253 -1083 -24255 0
-24251  24252 -24253 -1083 -24256 0

c  0+1 --> 1
c    (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧  p_1083) -> (-b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧  b^{361, 4}_0)
c  in CNF:
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_2
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_1
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨  b^{361, 4}_0
c  in DIMACS:
 24251  24252  24253 -1083 -24254 0
 24251  24252  24253 -1083 -24255 0
 24251  24252  24253 -1083  24256 0

c  1+1 --> 2
c    (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0 ∧  p_1083) -> (-b^{361, 4}_2 ∧  b^{361, 4}_1 ∧ -b^{361, 4}_0)
c  in CNF:
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_2
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨  b^{361, 4}_1
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ -p_1083 ∨ -b^{361, 4}_0
c  in DIMACS:
 24251  24252 -24253 -1083 -24254 0
 24251  24252 -24253 -1083  24255 0
 24251  24252 -24253 -1083 -24256 0

c  2+1 --> break 
c    (-b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧  p_1083) -> break
c  in CNF:
c     b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ -p_1083 ∨ break
c  in DIMACS:
 24251 -24252  24253 -1083 1162 0


c  2-1 --> 1
c    (-b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧ -p_1083) -> (-b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧  b^{361, 4}_0)
c  in CNF:
c     b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_2
c     b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_1
c     b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨  b^{361, 4}_0
c  in DIMACS:
 24251 -24252  24253  1083 -24254 0
 24251 -24252  24253  1083 -24255 0
 24251 -24252  24253  1083  24256 0

c  1-1 --> 0
c    (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0 ∧ -p_1083) -> (-b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧ -b^{361, 4}_0)
c  in CNF:
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_2
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_1
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_0
c  in DIMACS:
 24251  24252 -24253  1083 -24254 0
 24251  24252 -24253  1083 -24255 0
 24251  24252 -24253  1083 -24256 0

c  0-1 --> -1
c    (-b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧ -p_1083) -> ( b^{361, 4}_2 ∧ -b^{361, 4}_1 ∧  b^{361, 4}_0)
c  in CNF:
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨  b^{361, 4}_2
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_1
c     b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨  b^{361, 4}_0
c  in DIMACS:
 24251  24252  24253  1083  24254 0
 24251  24252  24253  1083 -24255 0
 24251  24252  24253  1083  24256 0

c  -1-1 --> -2
c    ( b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧  b^{361, 3}_0 ∧ -p_1083) -> ( b^{361, 4}_2 ∧  b^{361, 4}_1 ∧ -b^{361, 4}_0)
c  in CNF:
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨  b^{361, 4}_2
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨  b^{361, 4}_1
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨  p_1083 ∨ -b^{361, 4}_0
c  in DIMACS:
-24251  24252 -24253  1083  24254 0
-24251  24252 -24253  1083  24255 0
-24251  24252 -24253  1083 -24256 0

c  -2-1 --> break 
c    ( b^{361, 3}_2 ∧  b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧ -p_1083) -> break
c  in CNF:
c    -b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨  b^{361, 3}_0 ∨  p_1083 ∨ break
c  in DIMACS:
-24251 -24252  24253  1083 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{361, 3}_2 ∧ -b^{361, 3}_1 ∧ -b^{361, 3}_0 ∧ true) 
c  in CNF:
c    -b^{361, 3}_2 ∨  b^{361, 3}_1 ∨  b^{361, 3}_0 ∨ false 
c  in DIMACS:
-24251  24252  24253  0

c  3 does not represent an automaton state.
c    -(-b^{361, 3}_2 ∧  b^{361, 3}_1 ∧  b^{361, 3}_0 ∧ true) 
c  in CNF:
c     b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ false 
c  in DIMACS:
 24251 -24252 -24253  0
c  -3 does not represent an automaton state.
c    -( b^{361, 3}_2 ∧  b^{361, 3}_1 ∧  b^{361, 3}_0 ∧ true) 
c  in CNF:
c    -b^{361, 3}_2 ∨ -b^{361, 3}_1 ∨ -b^{361, 3}_0 ∨ false 
c  in DIMACS:
-24251 -24252 -24253  0

c INIT for k = 362
c    -b^{362, 1}_2
c    -b^{362, 1}_1
c    -b^{362, 1}_0
c  in DIMACS:
-24257 0
-24258 0
-24259 0

c Transitions for k = 362
c i = 1
c  -2+1 --> -1
c    ( b^{362, 1}_2 ∧  b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧  p_362) -> ( b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0)
c  in CNF:
c    -b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨  b^{362, 2}_2
c    -b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_1
c    -b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨  b^{362, 2}_0
c  in DIMACS:
-24257 -24258  24259 -362  24260 0
-24257 -24258  24259 -362 -24261 0
-24257 -24258  24259 -362  24262 0

c  -1+1 --> 0
c    ( b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧  b^{362, 1}_0 ∧  p_362) -> (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧ -b^{362, 2}_0)
c  in CNF:
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_2
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_1
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_0
c  in DIMACS:
-24257  24258 -24259 -362 -24260 0
-24257  24258 -24259 -362 -24261 0
-24257  24258 -24259 -362 -24262 0

c  0+1 --> 1
c    (-b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧  p_362) -> (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0)
c  in CNF:
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_2
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_1
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨  b^{362, 2}_0
c  in DIMACS:
 24257  24258  24259 -362 -24260 0
 24257  24258  24259 -362 -24261 0
 24257  24258  24259 -362  24262 0

c  1+1 --> 2
c    (-b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧  b^{362, 1}_0 ∧  p_362) -> (-b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0)
c  in CNF:
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_2
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨  b^{362, 2}_1
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ -p_362 ∨ -b^{362, 2}_0
c  in DIMACS:
 24257  24258 -24259 -362 -24260 0
 24257  24258 -24259 -362  24261 0
 24257  24258 -24259 -362 -24262 0

c  2+1 --> break 
c    (-b^{362, 1}_2 ∧  b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧  p_362) -> break
c  in CNF:
c     b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ -p_362 ∨ break
c  in DIMACS:
 24257 -24258  24259 -362 1162 0


c  2-1 --> 1
c    (-b^{362, 1}_2 ∧  b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧ -p_362) -> (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0)
c  in CNF:
c     b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_2
c     b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_1
c     b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨  b^{362, 2}_0
c  in DIMACS:
 24257 -24258  24259  362 -24260 0
 24257 -24258  24259  362 -24261 0
 24257 -24258  24259  362  24262 0

c  1-1 --> 0
c    (-b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧  b^{362, 1}_0 ∧ -p_362) -> (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧ -b^{362, 2}_0)
c  in CNF:
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_2
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_1
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_0
c  in DIMACS:
 24257  24258 -24259  362 -24260 0
 24257  24258 -24259  362 -24261 0
 24257  24258 -24259  362 -24262 0

c  0-1 --> -1
c    (-b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧ -p_362) -> ( b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0)
c  in CNF:
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨  b^{362, 2}_2
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_1
c     b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨  b^{362, 2}_0
c  in DIMACS:
 24257  24258  24259  362  24260 0
 24257  24258  24259  362 -24261 0
 24257  24258  24259  362  24262 0

c  -1-1 --> -2
c    ( b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧  b^{362, 1}_0 ∧ -p_362) -> ( b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0)
c  in CNF:
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨  b^{362, 2}_2
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨  b^{362, 2}_1
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨  p_362 ∨ -b^{362, 2}_0
c  in DIMACS:
-24257  24258 -24259  362  24260 0
-24257  24258 -24259  362  24261 0
-24257  24258 -24259  362 -24262 0

c  -2-1 --> break 
c    ( b^{362, 1}_2 ∧  b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧ -p_362) -> break
c  in CNF:
c    -b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨  b^{362, 1}_0 ∨  p_362 ∨ break
c  in DIMACS:
-24257 -24258  24259  362 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{362, 1}_2 ∧ -b^{362, 1}_1 ∧ -b^{362, 1}_0 ∧ true) 
c  in CNF:
c    -b^{362, 1}_2 ∨  b^{362, 1}_1 ∨  b^{362, 1}_0 ∨ false 
c  in DIMACS:
-24257  24258  24259  0

c  3 does not represent an automaton state.
c    -(-b^{362, 1}_2 ∧  b^{362, 1}_1 ∧  b^{362, 1}_0 ∧ true) 
c  in CNF:
c     b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ false 
c  in DIMACS:
 24257 -24258 -24259  0
c  -3 does not represent an automaton state.
c    -( b^{362, 1}_2 ∧  b^{362, 1}_1 ∧  b^{362, 1}_0 ∧ true) 
c  in CNF:
c    -b^{362, 1}_2 ∨ -b^{362, 1}_1 ∨ -b^{362, 1}_0 ∨ false 
c  in DIMACS:
-24257 -24258 -24259  0

c i = 2
c  -2+1 --> -1
c    ( b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧  p_724) -> ( b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0)
c  in CNF:
c    -b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨  b^{362, 3}_2
c    -b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_1
c    -b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨  b^{362, 3}_0
c  in DIMACS:
-24260 -24261  24262 -724  24263 0
-24260 -24261  24262 -724 -24264 0
-24260 -24261  24262 -724  24265 0

c  -1+1 --> 0
c    ( b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0 ∧  p_724) -> (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧ -b^{362, 3}_0)
c  in CNF:
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_2
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_1
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_0
c  in DIMACS:
-24260  24261 -24262 -724 -24263 0
-24260  24261 -24262 -724 -24264 0
-24260  24261 -24262 -724 -24265 0

c  0+1 --> 1
c    (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧  p_724) -> (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0)
c  in CNF:
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_2
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_1
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨  b^{362, 3}_0
c  in DIMACS:
 24260  24261  24262 -724 -24263 0
 24260  24261  24262 -724 -24264 0
 24260  24261  24262 -724  24265 0

c  1+1 --> 2
c    (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0 ∧  p_724) -> (-b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0)
c  in CNF:
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_2
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨  b^{362, 3}_1
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ -p_724 ∨ -b^{362, 3}_0
c  in DIMACS:
 24260  24261 -24262 -724 -24263 0
 24260  24261 -24262 -724  24264 0
 24260  24261 -24262 -724 -24265 0

c  2+1 --> break 
c    (-b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧  p_724) -> break
c  in CNF:
c     b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ -p_724 ∨ break
c  in DIMACS:
 24260 -24261  24262 -724 1162 0


c  2-1 --> 1
c    (-b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧ -p_724) -> (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0)
c  in CNF:
c     b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_2
c     b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_1
c     b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨  b^{362, 3}_0
c  in DIMACS:
 24260 -24261  24262  724 -24263 0
 24260 -24261  24262  724 -24264 0
 24260 -24261  24262  724  24265 0

c  1-1 --> 0
c    (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0 ∧ -p_724) -> (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧ -b^{362, 3}_0)
c  in CNF:
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_2
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_1
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_0
c  in DIMACS:
 24260  24261 -24262  724 -24263 0
 24260  24261 -24262  724 -24264 0
 24260  24261 -24262  724 -24265 0

c  0-1 --> -1
c    (-b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧ -p_724) -> ( b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0)
c  in CNF:
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨  b^{362, 3}_2
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_1
c     b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨  b^{362, 3}_0
c  in DIMACS:
 24260  24261  24262  724  24263 0
 24260  24261  24262  724 -24264 0
 24260  24261  24262  724  24265 0

c  -1-1 --> -2
c    ( b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧  b^{362, 2}_0 ∧ -p_724) -> ( b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0)
c  in CNF:
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨  b^{362, 3}_2
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨  b^{362, 3}_1
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨  p_724 ∨ -b^{362, 3}_0
c  in DIMACS:
-24260  24261 -24262  724  24263 0
-24260  24261 -24262  724  24264 0
-24260  24261 -24262  724 -24265 0

c  -2-1 --> break 
c    ( b^{362, 2}_2 ∧  b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧ -p_724) -> break
c  in CNF:
c    -b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨  b^{362, 2}_0 ∨  p_724 ∨ break
c  in DIMACS:
-24260 -24261  24262  724 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{362, 2}_2 ∧ -b^{362, 2}_1 ∧ -b^{362, 2}_0 ∧ true) 
c  in CNF:
c    -b^{362, 2}_2 ∨  b^{362, 2}_1 ∨  b^{362, 2}_0 ∨ false 
c  in DIMACS:
-24260  24261  24262  0

c  3 does not represent an automaton state.
c    -(-b^{362, 2}_2 ∧  b^{362, 2}_1 ∧  b^{362, 2}_0 ∧ true) 
c  in CNF:
c     b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ false 
c  in DIMACS:
 24260 -24261 -24262  0
c  -3 does not represent an automaton state.
c    -( b^{362, 2}_2 ∧  b^{362, 2}_1 ∧  b^{362, 2}_0 ∧ true) 
c  in CNF:
c    -b^{362, 2}_2 ∨ -b^{362, 2}_1 ∨ -b^{362, 2}_0 ∨ false 
c  in DIMACS:
-24260 -24261 -24262  0

c i = 3
c  -2+1 --> -1
c    ( b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧  p_1086) -> ( b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧  b^{362, 4}_0)
c  in CNF:
c    -b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨  b^{362, 4}_2
c    -b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_1
c    -b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨  b^{362, 4}_0
c  in DIMACS:
-24263 -24264  24265 -1086  24266 0
-24263 -24264  24265 -1086 -24267 0
-24263 -24264  24265 -1086  24268 0

c  -1+1 --> 0
c    ( b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0 ∧  p_1086) -> (-b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧ -b^{362, 4}_0)
c  in CNF:
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_2
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_1
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_0
c  in DIMACS:
-24263  24264 -24265 -1086 -24266 0
-24263  24264 -24265 -1086 -24267 0
-24263  24264 -24265 -1086 -24268 0

c  0+1 --> 1
c    (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧  p_1086) -> (-b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧  b^{362, 4}_0)
c  in CNF:
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_2
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_1
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨  b^{362, 4}_0
c  in DIMACS:
 24263  24264  24265 -1086 -24266 0
 24263  24264  24265 -1086 -24267 0
 24263  24264  24265 -1086  24268 0

c  1+1 --> 2
c    (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0 ∧  p_1086) -> (-b^{362, 4}_2 ∧  b^{362, 4}_1 ∧ -b^{362, 4}_0)
c  in CNF:
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_2
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨  b^{362, 4}_1
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ -p_1086 ∨ -b^{362, 4}_0
c  in DIMACS:
 24263  24264 -24265 -1086 -24266 0
 24263  24264 -24265 -1086  24267 0
 24263  24264 -24265 -1086 -24268 0

c  2+1 --> break 
c    (-b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧  p_1086) -> break
c  in CNF:
c     b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ -p_1086 ∨ break
c  in DIMACS:
 24263 -24264  24265 -1086 1162 0


c  2-1 --> 1
c    (-b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧ -p_1086) -> (-b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧  b^{362, 4}_0)
c  in CNF:
c     b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_2
c     b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_1
c     b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨  b^{362, 4}_0
c  in DIMACS:
 24263 -24264  24265  1086 -24266 0
 24263 -24264  24265  1086 -24267 0
 24263 -24264  24265  1086  24268 0

c  1-1 --> 0
c    (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0 ∧ -p_1086) -> (-b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧ -b^{362, 4}_0)
c  in CNF:
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_2
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_1
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_0
c  in DIMACS:
 24263  24264 -24265  1086 -24266 0
 24263  24264 -24265  1086 -24267 0
 24263  24264 -24265  1086 -24268 0

c  0-1 --> -1
c    (-b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧ -p_1086) -> ( b^{362, 4}_2 ∧ -b^{362, 4}_1 ∧  b^{362, 4}_0)
c  in CNF:
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨  b^{362, 4}_2
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_1
c     b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨  b^{362, 4}_0
c  in DIMACS:
 24263  24264  24265  1086  24266 0
 24263  24264  24265  1086 -24267 0
 24263  24264  24265  1086  24268 0

c  -1-1 --> -2
c    ( b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧  b^{362, 3}_0 ∧ -p_1086) -> ( b^{362, 4}_2 ∧  b^{362, 4}_1 ∧ -b^{362, 4}_0)
c  in CNF:
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨  b^{362, 4}_2
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨  b^{362, 4}_1
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨  p_1086 ∨ -b^{362, 4}_0
c  in DIMACS:
-24263  24264 -24265  1086  24266 0
-24263  24264 -24265  1086  24267 0
-24263  24264 -24265  1086 -24268 0

c  -2-1 --> break 
c    ( b^{362, 3}_2 ∧  b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧ -p_1086) -> break
c  in CNF:
c    -b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨  b^{362, 3}_0 ∨  p_1086 ∨ break
c  in DIMACS:
-24263 -24264  24265  1086 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{362, 3}_2 ∧ -b^{362, 3}_1 ∧ -b^{362, 3}_0 ∧ true) 
c  in CNF:
c    -b^{362, 3}_2 ∨  b^{362, 3}_1 ∨  b^{362, 3}_0 ∨ false 
c  in DIMACS:
-24263  24264  24265  0

c  3 does not represent an automaton state.
c    -(-b^{362, 3}_2 ∧  b^{362, 3}_1 ∧  b^{362, 3}_0 ∧ true) 
c  in CNF:
c     b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ false 
c  in DIMACS:
 24263 -24264 -24265  0
c  -3 does not represent an automaton state.
c    -( b^{362, 3}_2 ∧  b^{362, 3}_1 ∧  b^{362, 3}_0 ∧ true) 
c  in CNF:
c    -b^{362, 3}_2 ∨ -b^{362, 3}_1 ∨ -b^{362, 3}_0 ∨ false 
c  in DIMACS:
-24263 -24264 -24265  0

c INIT for k = 363
c    -b^{363, 1}_2
c    -b^{363, 1}_1
c    -b^{363, 1}_0
c  in DIMACS:
-24269 0
-24270 0
-24271 0

c Transitions for k = 363
c i = 1
c  -2+1 --> -1
c    ( b^{363, 1}_2 ∧  b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧  p_363) -> ( b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0)
c  in CNF:
c    -b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨  b^{363, 2}_2
c    -b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_1
c    -b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨  b^{363, 2}_0
c  in DIMACS:
-24269 -24270  24271 -363  24272 0
-24269 -24270  24271 -363 -24273 0
-24269 -24270  24271 -363  24274 0

c  -1+1 --> 0
c    ( b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧  b^{363, 1}_0 ∧  p_363) -> (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧ -b^{363, 2}_0)
c  in CNF:
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_2
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_1
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_0
c  in DIMACS:
-24269  24270 -24271 -363 -24272 0
-24269  24270 -24271 -363 -24273 0
-24269  24270 -24271 -363 -24274 0

c  0+1 --> 1
c    (-b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧  p_363) -> (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0)
c  in CNF:
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_2
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_1
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨  b^{363, 2}_0
c  in DIMACS:
 24269  24270  24271 -363 -24272 0
 24269  24270  24271 -363 -24273 0
 24269  24270  24271 -363  24274 0

c  1+1 --> 2
c    (-b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧  b^{363, 1}_0 ∧  p_363) -> (-b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0)
c  in CNF:
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_2
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨  b^{363, 2}_1
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ -p_363 ∨ -b^{363, 2}_0
c  in DIMACS:
 24269  24270 -24271 -363 -24272 0
 24269  24270 -24271 -363  24273 0
 24269  24270 -24271 -363 -24274 0

c  2+1 --> break 
c    (-b^{363, 1}_2 ∧  b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧  p_363) -> break
c  in CNF:
c     b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ -p_363 ∨ break
c  in DIMACS:
 24269 -24270  24271 -363 1162 0


c  2-1 --> 1
c    (-b^{363, 1}_2 ∧  b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧ -p_363) -> (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0)
c  in CNF:
c     b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_2
c     b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_1
c     b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨  b^{363, 2}_0
c  in DIMACS:
 24269 -24270  24271  363 -24272 0
 24269 -24270  24271  363 -24273 0
 24269 -24270  24271  363  24274 0

c  1-1 --> 0
c    (-b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧  b^{363, 1}_0 ∧ -p_363) -> (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧ -b^{363, 2}_0)
c  in CNF:
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_2
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_1
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_0
c  in DIMACS:
 24269  24270 -24271  363 -24272 0
 24269  24270 -24271  363 -24273 0
 24269  24270 -24271  363 -24274 0

c  0-1 --> -1
c    (-b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧ -p_363) -> ( b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0)
c  in CNF:
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨  b^{363, 2}_2
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_1
c     b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨  b^{363, 2}_0
c  in DIMACS:
 24269  24270  24271  363  24272 0
 24269  24270  24271  363 -24273 0
 24269  24270  24271  363  24274 0

c  -1-1 --> -2
c    ( b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧  b^{363, 1}_0 ∧ -p_363) -> ( b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0)
c  in CNF:
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨  b^{363, 2}_2
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨  b^{363, 2}_1
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨  p_363 ∨ -b^{363, 2}_0
c  in DIMACS:
-24269  24270 -24271  363  24272 0
-24269  24270 -24271  363  24273 0
-24269  24270 -24271  363 -24274 0

c  -2-1 --> break 
c    ( b^{363, 1}_2 ∧  b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧ -p_363) -> break
c  in CNF:
c    -b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨  b^{363, 1}_0 ∨  p_363 ∨ break
c  in DIMACS:
-24269 -24270  24271  363 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{363, 1}_2 ∧ -b^{363, 1}_1 ∧ -b^{363, 1}_0 ∧ true) 
c  in CNF:
c    -b^{363, 1}_2 ∨  b^{363, 1}_1 ∨  b^{363, 1}_0 ∨ false 
c  in DIMACS:
-24269  24270  24271  0

c  3 does not represent an automaton state.
c    -(-b^{363, 1}_2 ∧  b^{363, 1}_1 ∧  b^{363, 1}_0 ∧ true) 
c  in CNF:
c     b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ false 
c  in DIMACS:
 24269 -24270 -24271  0
c  -3 does not represent an automaton state.
c    -( b^{363, 1}_2 ∧  b^{363, 1}_1 ∧  b^{363, 1}_0 ∧ true) 
c  in CNF:
c    -b^{363, 1}_2 ∨ -b^{363, 1}_1 ∨ -b^{363, 1}_0 ∨ false 
c  in DIMACS:
-24269 -24270 -24271  0

c i = 2
c  -2+1 --> -1
c    ( b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧  p_726) -> ( b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0)
c  in CNF:
c    -b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨  b^{363, 3}_2
c    -b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_1
c    -b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨  b^{363, 3}_0
c  in DIMACS:
-24272 -24273  24274 -726  24275 0
-24272 -24273  24274 -726 -24276 0
-24272 -24273  24274 -726  24277 0

c  -1+1 --> 0
c    ( b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0 ∧  p_726) -> (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧ -b^{363, 3}_0)
c  in CNF:
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_2
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_1
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_0
c  in DIMACS:
-24272  24273 -24274 -726 -24275 0
-24272  24273 -24274 -726 -24276 0
-24272  24273 -24274 -726 -24277 0

c  0+1 --> 1
c    (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧  p_726) -> (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0)
c  in CNF:
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_2
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_1
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨  b^{363, 3}_0
c  in DIMACS:
 24272  24273  24274 -726 -24275 0
 24272  24273  24274 -726 -24276 0
 24272  24273  24274 -726  24277 0

c  1+1 --> 2
c    (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0 ∧  p_726) -> (-b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0)
c  in CNF:
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_2
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨  b^{363, 3}_1
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ -p_726 ∨ -b^{363, 3}_0
c  in DIMACS:
 24272  24273 -24274 -726 -24275 0
 24272  24273 -24274 -726  24276 0
 24272  24273 -24274 -726 -24277 0

c  2+1 --> break 
c    (-b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧  p_726) -> break
c  in CNF:
c     b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ -p_726 ∨ break
c  in DIMACS:
 24272 -24273  24274 -726 1162 0


c  2-1 --> 1
c    (-b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧ -p_726) -> (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0)
c  in CNF:
c     b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_2
c     b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_1
c     b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨  b^{363, 3}_0
c  in DIMACS:
 24272 -24273  24274  726 -24275 0
 24272 -24273  24274  726 -24276 0
 24272 -24273  24274  726  24277 0

c  1-1 --> 0
c    (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0 ∧ -p_726) -> (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧ -b^{363, 3}_0)
c  in CNF:
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_2
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_1
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_0
c  in DIMACS:
 24272  24273 -24274  726 -24275 0
 24272  24273 -24274  726 -24276 0
 24272  24273 -24274  726 -24277 0

c  0-1 --> -1
c    (-b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧ -p_726) -> ( b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0)
c  in CNF:
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨  b^{363, 3}_2
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_1
c     b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨  b^{363, 3}_0
c  in DIMACS:
 24272  24273  24274  726  24275 0
 24272  24273  24274  726 -24276 0
 24272  24273  24274  726  24277 0

c  -1-1 --> -2
c    ( b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧  b^{363, 2}_0 ∧ -p_726) -> ( b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0)
c  in CNF:
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨  b^{363, 3}_2
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨  b^{363, 3}_1
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨  p_726 ∨ -b^{363, 3}_0
c  in DIMACS:
-24272  24273 -24274  726  24275 0
-24272  24273 -24274  726  24276 0
-24272  24273 -24274  726 -24277 0

c  -2-1 --> break 
c    ( b^{363, 2}_2 ∧  b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧ -p_726) -> break
c  in CNF:
c    -b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨  b^{363, 2}_0 ∨  p_726 ∨ break
c  in DIMACS:
-24272 -24273  24274  726 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{363, 2}_2 ∧ -b^{363, 2}_1 ∧ -b^{363, 2}_0 ∧ true) 
c  in CNF:
c    -b^{363, 2}_2 ∨  b^{363, 2}_1 ∨  b^{363, 2}_0 ∨ false 
c  in DIMACS:
-24272  24273  24274  0

c  3 does not represent an automaton state.
c    -(-b^{363, 2}_2 ∧  b^{363, 2}_1 ∧  b^{363, 2}_0 ∧ true) 
c  in CNF:
c     b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ false 
c  in DIMACS:
 24272 -24273 -24274  0
c  -3 does not represent an automaton state.
c    -( b^{363, 2}_2 ∧  b^{363, 2}_1 ∧  b^{363, 2}_0 ∧ true) 
c  in CNF:
c    -b^{363, 2}_2 ∨ -b^{363, 2}_1 ∨ -b^{363, 2}_0 ∨ false 
c  in DIMACS:
-24272 -24273 -24274  0

c i = 3
c  -2+1 --> -1
c    ( b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧  p_1089) -> ( b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧  b^{363, 4}_0)
c  in CNF:
c    -b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨  b^{363, 4}_2
c    -b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_1
c    -b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨  b^{363, 4}_0
c  in DIMACS:
-24275 -24276  24277 -1089  24278 0
-24275 -24276  24277 -1089 -24279 0
-24275 -24276  24277 -1089  24280 0

c  -1+1 --> 0
c    ( b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0 ∧  p_1089) -> (-b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧ -b^{363, 4}_0)
c  in CNF:
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_2
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_1
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_0
c  in DIMACS:
-24275  24276 -24277 -1089 -24278 0
-24275  24276 -24277 -1089 -24279 0
-24275  24276 -24277 -1089 -24280 0

c  0+1 --> 1
c    (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧  p_1089) -> (-b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧  b^{363, 4}_0)
c  in CNF:
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_2
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_1
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨  b^{363, 4}_0
c  in DIMACS:
 24275  24276  24277 -1089 -24278 0
 24275  24276  24277 -1089 -24279 0
 24275  24276  24277 -1089  24280 0

c  1+1 --> 2
c    (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0 ∧  p_1089) -> (-b^{363, 4}_2 ∧  b^{363, 4}_1 ∧ -b^{363, 4}_0)
c  in CNF:
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_2
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨  b^{363, 4}_1
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ -p_1089 ∨ -b^{363, 4}_0
c  in DIMACS:
 24275  24276 -24277 -1089 -24278 0
 24275  24276 -24277 -1089  24279 0
 24275  24276 -24277 -1089 -24280 0

c  2+1 --> break 
c    (-b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧  p_1089) -> break
c  in CNF:
c     b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ -p_1089 ∨ break
c  in DIMACS:
 24275 -24276  24277 -1089 1162 0


c  2-1 --> 1
c    (-b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧ -p_1089) -> (-b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧  b^{363, 4}_0)
c  in CNF:
c     b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_2
c     b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_1
c     b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨  b^{363, 4}_0
c  in DIMACS:
 24275 -24276  24277  1089 -24278 0
 24275 -24276  24277  1089 -24279 0
 24275 -24276  24277  1089  24280 0

c  1-1 --> 0
c    (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0 ∧ -p_1089) -> (-b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧ -b^{363, 4}_0)
c  in CNF:
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_2
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_1
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_0
c  in DIMACS:
 24275  24276 -24277  1089 -24278 0
 24275  24276 -24277  1089 -24279 0
 24275  24276 -24277  1089 -24280 0

c  0-1 --> -1
c    (-b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧ -p_1089) -> ( b^{363, 4}_2 ∧ -b^{363, 4}_1 ∧  b^{363, 4}_0)
c  in CNF:
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨  b^{363, 4}_2
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_1
c     b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨  b^{363, 4}_0
c  in DIMACS:
 24275  24276  24277  1089  24278 0
 24275  24276  24277  1089 -24279 0
 24275  24276  24277  1089  24280 0

c  -1-1 --> -2
c    ( b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧  b^{363, 3}_0 ∧ -p_1089) -> ( b^{363, 4}_2 ∧  b^{363, 4}_1 ∧ -b^{363, 4}_0)
c  in CNF:
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨  b^{363, 4}_2
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨  b^{363, 4}_1
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨  p_1089 ∨ -b^{363, 4}_0
c  in DIMACS:
-24275  24276 -24277  1089  24278 0
-24275  24276 -24277  1089  24279 0
-24275  24276 -24277  1089 -24280 0

c  -2-1 --> break 
c    ( b^{363, 3}_2 ∧  b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧ -p_1089) -> break
c  in CNF:
c    -b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨  b^{363, 3}_0 ∨  p_1089 ∨ break
c  in DIMACS:
-24275 -24276  24277  1089 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{363, 3}_2 ∧ -b^{363, 3}_1 ∧ -b^{363, 3}_0 ∧ true) 
c  in CNF:
c    -b^{363, 3}_2 ∨  b^{363, 3}_1 ∨  b^{363, 3}_0 ∨ false 
c  in DIMACS:
-24275  24276  24277  0

c  3 does not represent an automaton state.
c    -(-b^{363, 3}_2 ∧  b^{363, 3}_1 ∧  b^{363, 3}_0 ∧ true) 
c  in CNF:
c     b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ false 
c  in DIMACS:
 24275 -24276 -24277  0
c  -3 does not represent an automaton state.
c    -( b^{363, 3}_2 ∧  b^{363, 3}_1 ∧  b^{363, 3}_0 ∧ true) 
c  in CNF:
c    -b^{363, 3}_2 ∨ -b^{363, 3}_1 ∨ -b^{363, 3}_0 ∨ false 
c  in DIMACS:
-24275 -24276 -24277  0

c INIT for k = 364
c    -b^{364, 1}_2
c    -b^{364, 1}_1
c    -b^{364, 1}_0
c  in DIMACS:
-24281 0
-24282 0
-24283 0

c Transitions for k = 364
c i = 1
c  -2+1 --> -1
c    ( b^{364, 1}_2 ∧  b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧  p_364) -> ( b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0)
c  in CNF:
c    -b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨  b^{364, 2}_2
c    -b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_1
c    -b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨  b^{364, 2}_0
c  in DIMACS:
-24281 -24282  24283 -364  24284 0
-24281 -24282  24283 -364 -24285 0
-24281 -24282  24283 -364  24286 0

c  -1+1 --> 0
c    ( b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧  b^{364, 1}_0 ∧  p_364) -> (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧ -b^{364, 2}_0)
c  in CNF:
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_2
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_1
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_0
c  in DIMACS:
-24281  24282 -24283 -364 -24284 0
-24281  24282 -24283 -364 -24285 0
-24281  24282 -24283 -364 -24286 0

c  0+1 --> 1
c    (-b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧  p_364) -> (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0)
c  in CNF:
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_2
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_1
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨  b^{364, 2}_0
c  in DIMACS:
 24281  24282  24283 -364 -24284 0
 24281  24282  24283 -364 -24285 0
 24281  24282  24283 -364  24286 0

c  1+1 --> 2
c    (-b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧  b^{364, 1}_0 ∧  p_364) -> (-b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0)
c  in CNF:
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_2
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨  b^{364, 2}_1
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ -p_364 ∨ -b^{364, 2}_0
c  in DIMACS:
 24281  24282 -24283 -364 -24284 0
 24281  24282 -24283 -364  24285 0
 24281  24282 -24283 -364 -24286 0

c  2+1 --> break 
c    (-b^{364, 1}_2 ∧  b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧  p_364) -> break
c  in CNF:
c     b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ -p_364 ∨ break
c  in DIMACS:
 24281 -24282  24283 -364 1162 0


c  2-1 --> 1
c    (-b^{364, 1}_2 ∧  b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧ -p_364) -> (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0)
c  in CNF:
c     b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_2
c     b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_1
c     b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨  b^{364, 2}_0
c  in DIMACS:
 24281 -24282  24283  364 -24284 0
 24281 -24282  24283  364 -24285 0
 24281 -24282  24283  364  24286 0

c  1-1 --> 0
c    (-b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧  b^{364, 1}_0 ∧ -p_364) -> (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧ -b^{364, 2}_0)
c  in CNF:
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_2
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_1
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_0
c  in DIMACS:
 24281  24282 -24283  364 -24284 0
 24281  24282 -24283  364 -24285 0
 24281  24282 -24283  364 -24286 0

c  0-1 --> -1
c    (-b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧ -p_364) -> ( b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0)
c  in CNF:
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨  b^{364, 2}_2
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_1
c     b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨  b^{364, 2}_0
c  in DIMACS:
 24281  24282  24283  364  24284 0
 24281  24282  24283  364 -24285 0
 24281  24282  24283  364  24286 0

c  -1-1 --> -2
c    ( b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧  b^{364, 1}_0 ∧ -p_364) -> ( b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0)
c  in CNF:
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨  b^{364, 2}_2
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨  b^{364, 2}_1
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨  p_364 ∨ -b^{364, 2}_0
c  in DIMACS:
-24281  24282 -24283  364  24284 0
-24281  24282 -24283  364  24285 0
-24281  24282 -24283  364 -24286 0

c  -2-1 --> break 
c    ( b^{364, 1}_2 ∧  b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧ -p_364) -> break
c  in CNF:
c    -b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨  b^{364, 1}_0 ∨  p_364 ∨ break
c  in DIMACS:
-24281 -24282  24283  364 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{364, 1}_2 ∧ -b^{364, 1}_1 ∧ -b^{364, 1}_0 ∧ true) 
c  in CNF:
c    -b^{364, 1}_2 ∨  b^{364, 1}_1 ∨  b^{364, 1}_0 ∨ false 
c  in DIMACS:
-24281  24282  24283  0

c  3 does not represent an automaton state.
c    -(-b^{364, 1}_2 ∧  b^{364, 1}_1 ∧  b^{364, 1}_0 ∧ true) 
c  in CNF:
c     b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ false 
c  in DIMACS:
 24281 -24282 -24283  0
c  -3 does not represent an automaton state.
c    -( b^{364, 1}_2 ∧  b^{364, 1}_1 ∧  b^{364, 1}_0 ∧ true) 
c  in CNF:
c    -b^{364, 1}_2 ∨ -b^{364, 1}_1 ∨ -b^{364, 1}_0 ∨ false 
c  in DIMACS:
-24281 -24282 -24283  0

c i = 2
c  -2+1 --> -1
c    ( b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧  p_728) -> ( b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0)
c  in CNF:
c    -b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨  b^{364, 3}_2
c    -b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_1
c    -b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨  b^{364, 3}_0
c  in DIMACS:
-24284 -24285  24286 -728  24287 0
-24284 -24285  24286 -728 -24288 0
-24284 -24285  24286 -728  24289 0

c  -1+1 --> 0
c    ( b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0 ∧  p_728) -> (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧ -b^{364, 3}_0)
c  in CNF:
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_2
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_1
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_0
c  in DIMACS:
-24284  24285 -24286 -728 -24287 0
-24284  24285 -24286 -728 -24288 0
-24284  24285 -24286 -728 -24289 0

c  0+1 --> 1
c    (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧  p_728) -> (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0)
c  in CNF:
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_2
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_1
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨  b^{364, 3}_0
c  in DIMACS:
 24284  24285  24286 -728 -24287 0
 24284  24285  24286 -728 -24288 0
 24284  24285  24286 -728  24289 0

c  1+1 --> 2
c    (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0 ∧  p_728) -> (-b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0)
c  in CNF:
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_2
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨  b^{364, 3}_1
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ -p_728 ∨ -b^{364, 3}_0
c  in DIMACS:
 24284  24285 -24286 -728 -24287 0
 24284  24285 -24286 -728  24288 0
 24284  24285 -24286 -728 -24289 0

c  2+1 --> break 
c    (-b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧  p_728) -> break
c  in CNF:
c     b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ -p_728 ∨ break
c  in DIMACS:
 24284 -24285  24286 -728 1162 0


c  2-1 --> 1
c    (-b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧ -p_728) -> (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0)
c  in CNF:
c     b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_2
c     b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_1
c     b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨  b^{364, 3}_0
c  in DIMACS:
 24284 -24285  24286  728 -24287 0
 24284 -24285  24286  728 -24288 0
 24284 -24285  24286  728  24289 0

c  1-1 --> 0
c    (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0 ∧ -p_728) -> (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧ -b^{364, 3}_0)
c  in CNF:
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_2
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_1
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_0
c  in DIMACS:
 24284  24285 -24286  728 -24287 0
 24284  24285 -24286  728 -24288 0
 24284  24285 -24286  728 -24289 0

c  0-1 --> -1
c    (-b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧ -p_728) -> ( b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0)
c  in CNF:
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨  b^{364, 3}_2
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_1
c     b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨  b^{364, 3}_0
c  in DIMACS:
 24284  24285  24286  728  24287 0
 24284  24285  24286  728 -24288 0
 24284  24285  24286  728  24289 0

c  -1-1 --> -2
c    ( b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧  b^{364, 2}_0 ∧ -p_728) -> ( b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0)
c  in CNF:
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨  b^{364, 3}_2
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨  b^{364, 3}_1
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨  p_728 ∨ -b^{364, 3}_0
c  in DIMACS:
-24284  24285 -24286  728  24287 0
-24284  24285 -24286  728  24288 0
-24284  24285 -24286  728 -24289 0

c  -2-1 --> break 
c    ( b^{364, 2}_2 ∧  b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧ -p_728) -> break
c  in CNF:
c    -b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨  b^{364, 2}_0 ∨  p_728 ∨ break
c  in DIMACS:
-24284 -24285  24286  728 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{364, 2}_2 ∧ -b^{364, 2}_1 ∧ -b^{364, 2}_0 ∧ true) 
c  in CNF:
c    -b^{364, 2}_2 ∨  b^{364, 2}_1 ∨  b^{364, 2}_0 ∨ false 
c  in DIMACS:
-24284  24285  24286  0

c  3 does not represent an automaton state.
c    -(-b^{364, 2}_2 ∧  b^{364, 2}_1 ∧  b^{364, 2}_0 ∧ true) 
c  in CNF:
c     b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ false 
c  in DIMACS:
 24284 -24285 -24286  0
c  -3 does not represent an automaton state.
c    -( b^{364, 2}_2 ∧  b^{364, 2}_1 ∧  b^{364, 2}_0 ∧ true) 
c  in CNF:
c    -b^{364, 2}_2 ∨ -b^{364, 2}_1 ∨ -b^{364, 2}_0 ∨ false 
c  in DIMACS:
-24284 -24285 -24286  0

c i = 3
c  -2+1 --> -1
c    ( b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧  p_1092) -> ( b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧  b^{364, 4}_0)
c  in CNF:
c    -b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨  b^{364, 4}_2
c    -b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_1
c    -b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨  b^{364, 4}_0
c  in DIMACS:
-24287 -24288  24289 -1092  24290 0
-24287 -24288  24289 -1092 -24291 0
-24287 -24288  24289 -1092  24292 0

c  -1+1 --> 0
c    ( b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0 ∧  p_1092) -> (-b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧ -b^{364, 4}_0)
c  in CNF:
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_2
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_1
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_0
c  in DIMACS:
-24287  24288 -24289 -1092 -24290 0
-24287  24288 -24289 -1092 -24291 0
-24287  24288 -24289 -1092 -24292 0

c  0+1 --> 1
c    (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧  p_1092) -> (-b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧  b^{364, 4}_0)
c  in CNF:
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_2
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_1
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨  b^{364, 4}_0
c  in DIMACS:
 24287  24288  24289 -1092 -24290 0
 24287  24288  24289 -1092 -24291 0
 24287  24288  24289 -1092  24292 0

c  1+1 --> 2
c    (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0 ∧  p_1092) -> (-b^{364, 4}_2 ∧  b^{364, 4}_1 ∧ -b^{364, 4}_0)
c  in CNF:
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_2
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨  b^{364, 4}_1
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ -p_1092 ∨ -b^{364, 4}_0
c  in DIMACS:
 24287  24288 -24289 -1092 -24290 0
 24287  24288 -24289 -1092  24291 0
 24287  24288 -24289 -1092 -24292 0

c  2+1 --> break 
c    (-b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧  p_1092) -> break
c  in CNF:
c     b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ -p_1092 ∨ break
c  in DIMACS:
 24287 -24288  24289 -1092 1162 0


c  2-1 --> 1
c    (-b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧ -p_1092) -> (-b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧  b^{364, 4}_0)
c  in CNF:
c     b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_2
c     b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_1
c     b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨  b^{364, 4}_0
c  in DIMACS:
 24287 -24288  24289  1092 -24290 0
 24287 -24288  24289  1092 -24291 0
 24287 -24288  24289  1092  24292 0

c  1-1 --> 0
c    (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0 ∧ -p_1092) -> (-b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧ -b^{364, 4}_0)
c  in CNF:
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_2
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_1
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_0
c  in DIMACS:
 24287  24288 -24289  1092 -24290 0
 24287  24288 -24289  1092 -24291 0
 24287  24288 -24289  1092 -24292 0

c  0-1 --> -1
c    (-b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧ -p_1092) -> ( b^{364, 4}_2 ∧ -b^{364, 4}_1 ∧  b^{364, 4}_0)
c  in CNF:
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨  b^{364, 4}_2
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_1
c     b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨  b^{364, 4}_0
c  in DIMACS:
 24287  24288  24289  1092  24290 0
 24287  24288  24289  1092 -24291 0
 24287  24288  24289  1092  24292 0

c  -1-1 --> -2
c    ( b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧  b^{364, 3}_0 ∧ -p_1092) -> ( b^{364, 4}_2 ∧  b^{364, 4}_1 ∧ -b^{364, 4}_0)
c  in CNF:
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨  b^{364, 4}_2
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨  b^{364, 4}_1
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨  p_1092 ∨ -b^{364, 4}_0
c  in DIMACS:
-24287  24288 -24289  1092  24290 0
-24287  24288 -24289  1092  24291 0
-24287  24288 -24289  1092 -24292 0

c  -2-1 --> break 
c    ( b^{364, 3}_2 ∧  b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧ -p_1092) -> break
c  in CNF:
c    -b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨  b^{364, 3}_0 ∨  p_1092 ∨ break
c  in DIMACS:
-24287 -24288  24289  1092 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{364, 3}_2 ∧ -b^{364, 3}_1 ∧ -b^{364, 3}_0 ∧ true) 
c  in CNF:
c    -b^{364, 3}_2 ∨  b^{364, 3}_1 ∨  b^{364, 3}_0 ∨ false 
c  in DIMACS:
-24287  24288  24289  0

c  3 does not represent an automaton state.
c    -(-b^{364, 3}_2 ∧  b^{364, 3}_1 ∧  b^{364, 3}_0 ∧ true) 
c  in CNF:
c     b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ false 
c  in DIMACS:
 24287 -24288 -24289  0
c  -3 does not represent an automaton state.
c    -( b^{364, 3}_2 ∧  b^{364, 3}_1 ∧  b^{364, 3}_0 ∧ true) 
c  in CNF:
c    -b^{364, 3}_2 ∨ -b^{364, 3}_1 ∨ -b^{364, 3}_0 ∨ false 
c  in DIMACS:
-24287 -24288 -24289  0

c INIT for k = 365
c    -b^{365, 1}_2
c    -b^{365, 1}_1
c    -b^{365, 1}_0
c  in DIMACS:
-24293 0
-24294 0
-24295 0

c Transitions for k = 365
c i = 1
c  -2+1 --> -1
c    ( b^{365, 1}_2 ∧  b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧  p_365) -> ( b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0)
c  in CNF:
c    -b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨  b^{365, 2}_2
c    -b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_1
c    -b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨  b^{365, 2}_0
c  in DIMACS:
-24293 -24294  24295 -365  24296 0
-24293 -24294  24295 -365 -24297 0
-24293 -24294  24295 -365  24298 0

c  -1+1 --> 0
c    ( b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧  b^{365, 1}_0 ∧  p_365) -> (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧ -b^{365, 2}_0)
c  in CNF:
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_2
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_1
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_0
c  in DIMACS:
-24293  24294 -24295 -365 -24296 0
-24293  24294 -24295 -365 -24297 0
-24293  24294 -24295 -365 -24298 0

c  0+1 --> 1
c    (-b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧  p_365) -> (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0)
c  in CNF:
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_2
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_1
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨  b^{365, 2}_0
c  in DIMACS:
 24293  24294  24295 -365 -24296 0
 24293  24294  24295 -365 -24297 0
 24293  24294  24295 -365  24298 0

c  1+1 --> 2
c    (-b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧  b^{365, 1}_0 ∧  p_365) -> (-b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0)
c  in CNF:
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_2
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨  b^{365, 2}_1
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ -p_365 ∨ -b^{365, 2}_0
c  in DIMACS:
 24293  24294 -24295 -365 -24296 0
 24293  24294 -24295 -365  24297 0
 24293  24294 -24295 -365 -24298 0

c  2+1 --> break 
c    (-b^{365, 1}_2 ∧  b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧  p_365) -> break
c  in CNF:
c     b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ -p_365 ∨ break
c  in DIMACS:
 24293 -24294  24295 -365 1162 0


c  2-1 --> 1
c    (-b^{365, 1}_2 ∧  b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧ -p_365) -> (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0)
c  in CNF:
c     b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_2
c     b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_1
c     b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨  b^{365, 2}_0
c  in DIMACS:
 24293 -24294  24295  365 -24296 0
 24293 -24294  24295  365 -24297 0
 24293 -24294  24295  365  24298 0

c  1-1 --> 0
c    (-b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧  b^{365, 1}_0 ∧ -p_365) -> (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧ -b^{365, 2}_0)
c  in CNF:
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_2
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_1
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_0
c  in DIMACS:
 24293  24294 -24295  365 -24296 0
 24293  24294 -24295  365 -24297 0
 24293  24294 -24295  365 -24298 0

c  0-1 --> -1
c    (-b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧ -p_365) -> ( b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0)
c  in CNF:
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨  b^{365, 2}_2
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_1
c     b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨  b^{365, 2}_0
c  in DIMACS:
 24293  24294  24295  365  24296 0
 24293  24294  24295  365 -24297 0
 24293  24294  24295  365  24298 0

c  -1-1 --> -2
c    ( b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧  b^{365, 1}_0 ∧ -p_365) -> ( b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0)
c  in CNF:
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨  b^{365, 2}_2
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨  b^{365, 2}_1
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨  p_365 ∨ -b^{365, 2}_0
c  in DIMACS:
-24293  24294 -24295  365  24296 0
-24293  24294 -24295  365  24297 0
-24293  24294 -24295  365 -24298 0

c  -2-1 --> break 
c    ( b^{365, 1}_2 ∧  b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧ -p_365) -> break
c  in CNF:
c    -b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨  b^{365, 1}_0 ∨  p_365 ∨ break
c  in DIMACS:
-24293 -24294  24295  365 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{365, 1}_2 ∧ -b^{365, 1}_1 ∧ -b^{365, 1}_0 ∧ true) 
c  in CNF:
c    -b^{365, 1}_2 ∨  b^{365, 1}_1 ∨  b^{365, 1}_0 ∨ false 
c  in DIMACS:
-24293  24294  24295  0

c  3 does not represent an automaton state.
c    -(-b^{365, 1}_2 ∧  b^{365, 1}_1 ∧  b^{365, 1}_0 ∧ true) 
c  in CNF:
c     b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ false 
c  in DIMACS:
 24293 -24294 -24295  0
c  -3 does not represent an automaton state.
c    -( b^{365, 1}_2 ∧  b^{365, 1}_1 ∧  b^{365, 1}_0 ∧ true) 
c  in CNF:
c    -b^{365, 1}_2 ∨ -b^{365, 1}_1 ∨ -b^{365, 1}_0 ∨ false 
c  in DIMACS:
-24293 -24294 -24295  0

c i = 2
c  -2+1 --> -1
c    ( b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧  p_730) -> ( b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0)
c  in CNF:
c    -b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨  b^{365, 3}_2
c    -b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_1
c    -b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨  b^{365, 3}_0
c  in DIMACS:
-24296 -24297  24298 -730  24299 0
-24296 -24297  24298 -730 -24300 0
-24296 -24297  24298 -730  24301 0

c  -1+1 --> 0
c    ( b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0 ∧  p_730) -> (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧ -b^{365, 3}_0)
c  in CNF:
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_2
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_1
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_0
c  in DIMACS:
-24296  24297 -24298 -730 -24299 0
-24296  24297 -24298 -730 -24300 0
-24296  24297 -24298 -730 -24301 0

c  0+1 --> 1
c    (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧  p_730) -> (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0)
c  in CNF:
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_2
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_1
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨  b^{365, 3}_0
c  in DIMACS:
 24296  24297  24298 -730 -24299 0
 24296  24297  24298 -730 -24300 0
 24296  24297  24298 -730  24301 0

c  1+1 --> 2
c    (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0 ∧  p_730) -> (-b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0)
c  in CNF:
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_2
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨  b^{365, 3}_1
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ -p_730 ∨ -b^{365, 3}_0
c  in DIMACS:
 24296  24297 -24298 -730 -24299 0
 24296  24297 -24298 -730  24300 0
 24296  24297 -24298 -730 -24301 0

c  2+1 --> break 
c    (-b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧  p_730) -> break
c  in CNF:
c     b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ -p_730 ∨ break
c  in DIMACS:
 24296 -24297  24298 -730 1162 0


c  2-1 --> 1
c    (-b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧ -p_730) -> (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0)
c  in CNF:
c     b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_2
c     b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_1
c     b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨  b^{365, 3}_0
c  in DIMACS:
 24296 -24297  24298  730 -24299 0
 24296 -24297  24298  730 -24300 0
 24296 -24297  24298  730  24301 0

c  1-1 --> 0
c    (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0 ∧ -p_730) -> (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧ -b^{365, 3}_0)
c  in CNF:
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_2
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_1
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_0
c  in DIMACS:
 24296  24297 -24298  730 -24299 0
 24296  24297 -24298  730 -24300 0
 24296  24297 -24298  730 -24301 0

c  0-1 --> -1
c    (-b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧ -p_730) -> ( b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0)
c  in CNF:
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨  b^{365, 3}_2
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_1
c     b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨  b^{365, 3}_0
c  in DIMACS:
 24296  24297  24298  730  24299 0
 24296  24297  24298  730 -24300 0
 24296  24297  24298  730  24301 0

c  -1-1 --> -2
c    ( b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧  b^{365, 2}_0 ∧ -p_730) -> ( b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0)
c  in CNF:
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨  b^{365, 3}_2
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨  b^{365, 3}_1
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨  p_730 ∨ -b^{365, 3}_0
c  in DIMACS:
-24296  24297 -24298  730  24299 0
-24296  24297 -24298  730  24300 0
-24296  24297 -24298  730 -24301 0

c  -2-1 --> break 
c    ( b^{365, 2}_2 ∧  b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧ -p_730) -> break
c  in CNF:
c    -b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨  b^{365, 2}_0 ∨  p_730 ∨ break
c  in DIMACS:
-24296 -24297  24298  730 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{365, 2}_2 ∧ -b^{365, 2}_1 ∧ -b^{365, 2}_0 ∧ true) 
c  in CNF:
c    -b^{365, 2}_2 ∨  b^{365, 2}_1 ∨  b^{365, 2}_0 ∨ false 
c  in DIMACS:
-24296  24297  24298  0

c  3 does not represent an automaton state.
c    -(-b^{365, 2}_2 ∧  b^{365, 2}_1 ∧  b^{365, 2}_0 ∧ true) 
c  in CNF:
c     b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ false 
c  in DIMACS:
 24296 -24297 -24298  0
c  -3 does not represent an automaton state.
c    -( b^{365, 2}_2 ∧  b^{365, 2}_1 ∧  b^{365, 2}_0 ∧ true) 
c  in CNF:
c    -b^{365, 2}_2 ∨ -b^{365, 2}_1 ∨ -b^{365, 2}_0 ∨ false 
c  in DIMACS:
-24296 -24297 -24298  0

c i = 3
c  -2+1 --> -1
c    ( b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧  p_1095) -> ( b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧  b^{365, 4}_0)
c  in CNF:
c    -b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨  b^{365, 4}_2
c    -b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_1
c    -b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨  b^{365, 4}_0
c  in DIMACS:
-24299 -24300  24301 -1095  24302 0
-24299 -24300  24301 -1095 -24303 0
-24299 -24300  24301 -1095  24304 0

c  -1+1 --> 0
c    ( b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0 ∧  p_1095) -> (-b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧ -b^{365, 4}_0)
c  in CNF:
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_2
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_1
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_0
c  in DIMACS:
-24299  24300 -24301 -1095 -24302 0
-24299  24300 -24301 -1095 -24303 0
-24299  24300 -24301 -1095 -24304 0

c  0+1 --> 1
c    (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧  p_1095) -> (-b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧  b^{365, 4}_0)
c  in CNF:
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_2
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_1
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨  b^{365, 4}_0
c  in DIMACS:
 24299  24300  24301 -1095 -24302 0
 24299  24300  24301 -1095 -24303 0
 24299  24300  24301 -1095  24304 0

c  1+1 --> 2
c    (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0 ∧  p_1095) -> (-b^{365, 4}_2 ∧  b^{365, 4}_1 ∧ -b^{365, 4}_0)
c  in CNF:
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_2
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨  b^{365, 4}_1
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ -p_1095 ∨ -b^{365, 4}_0
c  in DIMACS:
 24299  24300 -24301 -1095 -24302 0
 24299  24300 -24301 -1095  24303 0
 24299  24300 -24301 -1095 -24304 0

c  2+1 --> break 
c    (-b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧  p_1095) -> break
c  in CNF:
c     b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ -p_1095 ∨ break
c  in DIMACS:
 24299 -24300  24301 -1095 1162 0


c  2-1 --> 1
c    (-b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧ -p_1095) -> (-b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧  b^{365, 4}_0)
c  in CNF:
c     b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_2
c     b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_1
c     b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨  b^{365, 4}_0
c  in DIMACS:
 24299 -24300  24301  1095 -24302 0
 24299 -24300  24301  1095 -24303 0
 24299 -24300  24301  1095  24304 0

c  1-1 --> 0
c    (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0 ∧ -p_1095) -> (-b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧ -b^{365, 4}_0)
c  in CNF:
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_2
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_1
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_0
c  in DIMACS:
 24299  24300 -24301  1095 -24302 0
 24299  24300 -24301  1095 -24303 0
 24299  24300 -24301  1095 -24304 0

c  0-1 --> -1
c    (-b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧ -p_1095) -> ( b^{365, 4}_2 ∧ -b^{365, 4}_1 ∧  b^{365, 4}_0)
c  in CNF:
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨  b^{365, 4}_2
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_1
c     b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨  b^{365, 4}_0
c  in DIMACS:
 24299  24300  24301  1095  24302 0
 24299  24300  24301  1095 -24303 0
 24299  24300  24301  1095  24304 0

c  -1-1 --> -2
c    ( b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧  b^{365, 3}_0 ∧ -p_1095) -> ( b^{365, 4}_2 ∧  b^{365, 4}_1 ∧ -b^{365, 4}_0)
c  in CNF:
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨  b^{365, 4}_2
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨  b^{365, 4}_1
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨  p_1095 ∨ -b^{365, 4}_0
c  in DIMACS:
-24299  24300 -24301  1095  24302 0
-24299  24300 -24301  1095  24303 0
-24299  24300 -24301  1095 -24304 0

c  -2-1 --> break 
c    ( b^{365, 3}_2 ∧  b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧ -p_1095) -> break
c  in CNF:
c    -b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨  b^{365, 3}_0 ∨  p_1095 ∨ break
c  in DIMACS:
-24299 -24300  24301  1095 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{365, 3}_2 ∧ -b^{365, 3}_1 ∧ -b^{365, 3}_0 ∧ true) 
c  in CNF:
c    -b^{365, 3}_2 ∨  b^{365, 3}_1 ∨  b^{365, 3}_0 ∨ false 
c  in DIMACS:
-24299  24300  24301  0

c  3 does not represent an automaton state.
c    -(-b^{365, 3}_2 ∧  b^{365, 3}_1 ∧  b^{365, 3}_0 ∧ true) 
c  in CNF:
c     b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ false 
c  in DIMACS:
 24299 -24300 -24301  0
c  -3 does not represent an automaton state.
c    -( b^{365, 3}_2 ∧  b^{365, 3}_1 ∧  b^{365, 3}_0 ∧ true) 
c  in CNF:
c    -b^{365, 3}_2 ∨ -b^{365, 3}_1 ∨ -b^{365, 3}_0 ∨ false 
c  in DIMACS:
-24299 -24300 -24301  0

c INIT for k = 366
c    -b^{366, 1}_2
c    -b^{366, 1}_1
c    -b^{366, 1}_0
c  in DIMACS:
-24305 0
-24306 0
-24307 0

c Transitions for k = 366
c i = 1
c  -2+1 --> -1
c    ( b^{366, 1}_2 ∧  b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧  p_366) -> ( b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0)
c  in CNF:
c    -b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨  b^{366, 2}_2
c    -b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_1
c    -b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨  b^{366, 2}_0
c  in DIMACS:
-24305 -24306  24307 -366  24308 0
-24305 -24306  24307 -366 -24309 0
-24305 -24306  24307 -366  24310 0

c  -1+1 --> 0
c    ( b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧  b^{366, 1}_0 ∧  p_366) -> (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧ -b^{366, 2}_0)
c  in CNF:
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_2
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_1
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_0
c  in DIMACS:
-24305  24306 -24307 -366 -24308 0
-24305  24306 -24307 -366 -24309 0
-24305  24306 -24307 -366 -24310 0

c  0+1 --> 1
c    (-b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧  p_366) -> (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0)
c  in CNF:
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_2
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_1
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨  b^{366, 2}_0
c  in DIMACS:
 24305  24306  24307 -366 -24308 0
 24305  24306  24307 -366 -24309 0
 24305  24306  24307 -366  24310 0

c  1+1 --> 2
c    (-b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧  b^{366, 1}_0 ∧  p_366) -> (-b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0)
c  in CNF:
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_2
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨  b^{366, 2}_1
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ -p_366 ∨ -b^{366, 2}_0
c  in DIMACS:
 24305  24306 -24307 -366 -24308 0
 24305  24306 -24307 -366  24309 0
 24305  24306 -24307 -366 -24310 0

c  2+1 --> break 
c    (-b^{366, 1}_2 ∧  b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧  p_366) -> break
c  in CNF:
c     b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ -p_366 ∨ break
c  in DIMACS:
 24305 -24306  24307 -366 1162 0


c  2-1 --> 1
c    (-b^{366, 1}_2 ∧  b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧ -p_366) -> (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0)
c  in CNF:
c     b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_2
c     b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_1
c     b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨  b^{366, 2}_0
c  in DIMACS:
 24305 -24306  24307  366 -24308 0
 24305 -24306  24307  366 -24309 0
 24305 -24306  24307  366  24310 0

c  1-1 --> 0
c    (-b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧  b^{366, 1}_0 ∧ -p_366) -> (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧ -b^{366, 2}_0)
c  in CNF:
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_2
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_1
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_0
c  in DIMACS:
 24305  24306 -24307  366 -24308 0
 24305  24306 -24307  366 -24309 0
 24305  24306 -24307  366 -24310 0

c  0-1 --> -1
c    (-b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧ -p_366) -> ( b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0)
c  in CNF:
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨  b^{366, 2}_2
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_1
c     b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨  b^{366, 2}_0
c  in DIMACS:
 24305  24306  24307  366  24308 0
 24305  24306  24307  366 -24309 0
 24305  24306  24307  366  24310 0

c  -1-1 --> -2
c    ( b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧  b^{366, 1}_0 ∧ -p_366) -> ( b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0)
c  in CNF:
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨  b^{366, 2}_2
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨  b^{366, 2}_1
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨  p_366 ∨ -b^{366, 2}_0
c  in DIMACS:
-24305  24306 -24307  366  24308 0
-24305  24306 -24307  366  24309 0
-24305  24306 -24307  366 -24310 0

c  -2-1 --> break 
c    ( b^{366, 1}_2 ∧  b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧ -p_366) -> break
c  in CNF:
c    -b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨  b^{366, 1}_0 ∨  p_366 ∨ break
c  in DIMACS:
-24305 -24306  24307  366 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{366, 1}_2 ∧ -b^{366, 1}_1 ∧ -b^{366, 1}_0 ∧ true) 
c  in CNF:
c    -b^{366, 1}_2 ∨  b^{366, 1}_1 ∨  b^{366, 1}_0 ∨ false 
c  in DIMACS:
-24305  24306  24307  0

c  3 does not represent an automaton state.
c    -(-b^{366, 1}_2 ∧  b^{366, 1}_1 ∧  b^{366, 1}_0 ∧ true) 
c  in CNF:
c     b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ false 
c  in DIMACS:
 24305 -24306 -24307  0
c  -3 does not represent an automaton state.
c    -( b^{366, 1}_2 ∧  b^{366, 1}_1 ∧  b^{366, 1}_0 ∧ true) 
c  in CNF:
c    -b^{366, 1}_2 ∨ -b^{366, 1}_1 ∨ -b^{366, 1}_0 ∨ false 
c  in DIMACS:
-24305 -24306 -24307  0

c i = 2
c  -2+1 --> -1
c    ( b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧  p_732) -> ( b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0)
c  in CNF:
c    -b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨  b^{366, 3}_2
c    -b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_1
c    -b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨  b^{366, 3}_0
c  in DIMACS:
-24308 -24309  24310 -732  24311 0
-24308 -24309  24310 -732 -24312 0
-24308 -24309  24310 -732  24313 0

c  -1+1 --> 0
c    ( b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0 ∧  p_732) -> (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧ -b^{366, 3}_0)
c  in CNF:
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_2
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_1
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_0
c  in DIMACS:
-24308  24309 -24310 -732 -24311 0
-24308  24309 -24310 -732 -24312 0
-24308  24309 -24310 -732 -24313 0

c  0+1 --> 1
c    (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧  p_732) -> (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0)
c  in CNF:
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_2
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_1
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨  b^{366, 3}_0
c  in DIMACS:
 24308  24309  24310 -732 -24311 0
 24308  24309  24310 -732 -24312 0
 24308  24309  24310 -732  24313 0

c  1+1 --> 2
c    (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0 ∧  p_732) -> (-b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0)
c  in CNF:
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_2
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨  b^{366, 3}_1
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ -p_732 ∨ -b^{366, 3}_0
c  in DIMACS:
 24308  24309 -24310 -732 -24311 0
 24308  24309 -24310 -732  24312 0
 24308  24309 -24310 -732 -24313 0

c  2+1 --> break 
c    (-b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧  p_732) -> break
c  in CNF:
c     b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ -p_732 ∨ break
c  in DIMACS:
 24308 -24309  24310 -732 1162 0


c  2-1 --> 1
c    (-b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧ -p_732) -> (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0)
c  in CNF:
c     b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_2
c     b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_1
c     b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨  b^{366, 3}_0
c  in DIMACS:
 24308 -24309  24310  732 -24311 0
 24308 -24309  24310  732 -24312 0
 24308 -24309  24310  732  24313 0

c  1-1 --> 0
c    (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0 ∧ -p_732) -> (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧ -b^{366, 3}_0)
c  in CNF:
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_2
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_1
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_0
c  in DIMACS:
 24308  24309 -24310  732 -24311 0
 24308  24309 -24310  732 -24312 0
 24308  24309 -24310  732 -24313 0

c  0-1 --> -1
c    (-b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧ -p_732) -> ( b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0)
c  in CNF:
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨  b^{366, 3}_2
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_1
c     b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨  b^{366, 3}_0
c  in DIMACS:
 24308  24309  24310  732  24311 0
 24308  24309  24310  732 -24312 0
 24308  24309  24310  732  24313 0

c  -1-1 --> -2
c    ( b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧  b^{366, 2}_0 ∧ -p_732) -> ( b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0)
c  in CNF:
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨  b^{366, 3}_2
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨  b^{366, 3}_1
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨  p_732 ∨ -b^{366, 3}_0
c  in DIMACS:
-24308  24309 -24310  732  24311 0
-24308  24309 -24310  732  24312 0
-24308  24309 -24310  732 -24313 0

c  -2-1 --> break 
c    ( b^{366, 2}_2 ∧  b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧ -p_732) -> break
c  in CNF:
c    -b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨  b^{366, 2}_0 ∨  p_732 ∨ break
c  in DIMACS:
-24308 -24309  24310  732 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{366, 2}_2 ∧ -b^{366, 2}_1 ∧ -b^{366, 2}_0 ∧ true) 
c  in CNF:
c    -b^{366, 2}_2 ∨  b^{366, 2}_1 ∨  b^{366, 2}_0 ∨ false 
c  in DIMACS:
-24308  24309  24310  0

c  3 does not represent an automaton state.
c    -(-b^{366, 2}_2 ∧  b^{366, 2}_1 ∧  b^{366, 2}_0 ∧ true) 
c  in CNF:
c     b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ false 
c  in DIMACS:
 24308 -24309 -24310  0
c  -3 does not represent an automaton state.
c    -( b^{366, 2}_2 ∧  b^{366, 2}_1 ∧  b^{366, 2}_0 ∧ true) 
c  in CNF:
c    -b^{366, 2}_2 ∨ -b^{366, 2}_1 ∨ -b^{366, 2}_0 ∨ false 
c  in DIMACS:
-24308 -24309 -24310  0

c i = 3
c  -2+1 --> -1
c    ( b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧  p_1098) -> ( b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧  b^{366, 4}_0)
c  in CNF:
c    -b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨  b^{366, 4}_2
c    -b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_1
c    -b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨  b^{366, 4}_0
c  in DIMACS:
-24311 -24312  24313 -1098  24314 0
-24311 -24312  24313 -1098 -24315 0
-24311 -24312  24313 -1098  24316 0

c  -1+1 --> 0
c    ( b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0 ∧  p_1098) -> (-b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧ -b^{366, 4}_0)
c  in CNF:
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_2
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_1
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_0
c  in DIMACS:
-24311  24312 -24313 -1098 -24314 0
-24311  24312 -24313 -1098 -24315 0
-24311  24312 -24313 -1098 -24316 0

c  0+1 --> 1
c    (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧  p_1098) -> (-b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧  b^{366, 4}_0)
c  in CNF:
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_2
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_1
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨  b^{366, 4}_0
c  in DIMACS:
 24311  24312  24313 -1098 -24314 0
 24311  24312  24313 -1098 -24315 0
 24311  24312  24313 -1098  24316 0

c  1+1 --> 2
c    (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0 ∧  p_1098) -> (-b^{366, 4}_2 ∧  b^{366, 4}_1 ∧ -b^{366, 4}_0)
c  in CNF:
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_2
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨  b^{366, 4}_1
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ -p_1098 ∨ -b^{366, 4}_0
c  in DIMACS:
 24311  24312 -24313 -1098 -24314 0
 24311  24312 -24313 -1098  24315 0
 24311  24312 -24313 -1098 -24316 0

c  2+1 --> break 
c    (-b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧  p_1098) -> break
c  in CNF:
c     b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ -p_1098 ∨ break
c  in DIMACS:
 24311 -24312  24313 -1098 1162 0


c  2-1 --> 1
c    (-b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧ -p_1098) -> (-b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧  b^{366, 4}_0)
c  in CNF:
c     b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_2
c     b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_1
c     b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨  b^{366, 4}_0
c  in DIMACS:
 24311 -24312  24313  1098 -24314 0
 24311 -24312  24313  1098 -24315 0
 24311 -24312  24313  1098  24316 0

c  1-1 --> 0
c    (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0 ∧ -p_1098) -> (-b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧ -b^{366, 4}_0)
c  in CNF:
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_2
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_1
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_0
c  in DIMACS:
 24311  24312 -24313  1098 -24314 0
 24311  24312 -24313  1098 -24315 0
 24311  24312 -24313  1098 -24316 0

c  0-1 --> -1
c    (-b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧ -p_1098) -> ( b^{366, 4}_2 ∧ -b^{366, 4}_1 ∧  b^{366, 4}_0)
c  in CNF:
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨  b^{366, 4}_2
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_1
c     b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨  b^{366, 4}_0
c  in DIMACS:
 24311  24312  24313  1098  24314 0
 24311  24312  24313  1098 -24315 0
 24311  24312  24313  1098  24316 0

c  -1-1 --> -2
c    ( b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧  b^{366, 3}_0 ∧ -p_1098) -> ( b^{366, 4}_2 ∧  b^{366, 4}_1 ∧ -b^{366, 4}_0)
c  in CNF:
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨  b^{366, 4}_2
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨  b^{366, 4}_1
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨  p_1098 ∨ -b^{366, 4}_0
c  in DIMACS:
-24311  24312 -24313  1098  24314 0
-24311  24312 -24313  1098  24315 0
-24311  24312 -24313  1098 -24316 0

c  -2-1 --> break 
c    ( b^{366, 3}_2 ∧  b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧ -p_1098) -> break
c  in CNF:
c    -b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨  b^{366, 3}_0 ∨  p_1098 ∨ break
c  in DIMACS:
-24311 -24312  24313  1098 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{366, 3}_2 ∧ -b^{366, 3}_1 ∧ -b^{366, 3}_0 ∧ true) 
c  in CNF:
c    -b^{366, 3}_2 ∨  b^{366, 3}_1 ∨  b^{366, 3}_0 ∨ false 
c  in DIMACS:
-24311  24312  24313  0

c  3 does not represent an automaton state.
c    -(-b^{366, 3}_2 ∧  b^{366, 3}_1 ∧  b^{366, 3}_0 ∧ true) 
c  in CNF:
c     b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ false 
c  in DIMACS:
 24311 -24312 -24313  0
c  -3 does not represent an automaton state.
c    -( b^{366, 3}_2 ∧  b^{366, 3}_1 ∧  b^{366, 3}_0 ∧ true) 
c  in CNF:
c    -b^{366, 3}_2 ∨ -b^{366, 3}_1 ∨ -b^{366, 3}_0 ∨ false 
c  in DIMACS:
-24311 -24312 -24313  0

c INIT for k = 367
c    -b^{367, 1}_2
c    -b^{367, 1}_1
c    -b^{367, 1}_0
c  in DIMACS:
-24317 0
-24318 0
-24319 0

c Transitions for k = 367
c i = 1
c  -2+1 --> -1
c    ( b^{367, 1}_2 ∧  b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧  p_367) -> ( b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0)
c  in CNF:
c    -b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨  b^{367, 2}_2
c    -b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_1
c    -b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨  b^{367, 2}_0
c  in DIMACS:
-24317 -24318  24319 -367  24320 0
-24317 -24318  24319 -367 -24321 0
-24317 -24318  24319 -367  24322 0

c  -1+1 --> 0
c    ( b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧  b^{367, 1}_0 ∧  p_367) -> (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧ -b^{367, 2}_0)
c  in CNF:
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_2
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_1
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_0
c  in DIMACS:
-24317  24318 -24319 -367 -24320 0
-24317  24318 -24319 -367 -24321 0
-24317  24318 -24319 -367 -24322 0

c  0+1 --> 1
c    (-b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧  p_367) -> (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0)
c  in CNF:
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_2
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_1
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨  b^{367, 2}_0
c  in DIMACS:
 24317  24318  24319 -367 -24320 0
 24317  24318  24319 -367 -24321 0
 24317  24318  24319 -367  24322 0

c  1+1 --> 2
c    (-b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧  b^{367, 1}_0 ∧  p_367) -> (-b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0)
c  in CNF:
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_2
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨  b^{367, 2}_1
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ -p_367 ∨ -b^{367, 2}_0
c  in DIMACS:
 24317  24318 -24319 -367 -24320 0
 24317  24318 -24319 -367  24321 0
 24317  24318 -24319 -367 -24322 0

c  2+1 --> break 
c    (-b^{367, 1}_2 ∧  b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧  p_367) -> break
c  in CNF:
c     b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ -p_367 ∨ break
c  in DIMACS:
 24317 -24318  24319 -367 1162 0


c  2-1 --> 1
c    (-b^{367, 1}_2 ∧  b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧ -p_367) -> (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0)
c  in CNF:
c     b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_2
c     b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_1
c     b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨  b^{367, 2}_0
c  in DIMACS:
 24317 -24318  24319  367 -24320 0
 24317 -24318  24319  367 -24321 0
 24317 -24318  24319  367  24322 0

c  1-1 --> 0
c    (-b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧  b^{367, 1}_0 ∧ -p_367) -> (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧ -b^{367, 2}_0)
c  in CNF:
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_2
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_1
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_0
c  in DIMACS:
 24317  24318 -24319  367 -24320 0
 24317  24318 -24319  367 -24321 0
 24317  24318 -24319  367 -24322 0

c  0-1 --> -1
c    (-b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧ -p_367) -> ( b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0)
c  in CNF:
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨  b^{367, 2}_2
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_1
c     b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨  b^{367, 2}_0
c  in DIMACS:
 24317  24318  24319  367  24320 0
 24317  24318  24319  367 -24321 0
 24317  24318  24319  367  24322 0

c  -1-1 --> -2
c    ( b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧  b^{367, 1}_0 ∧ -p_367) -> ( b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0)
c  in CNF:
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨  b^{367, 2}_2
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨  b^{367, 2}_1
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨  p_367 ∨ -b^{367, 2}_0
c  in DIMACS:
-24317  24318 -24319  367  24320 0
-24317  24318 -24319  367  24321 0
-24317  24318 -24319  367 -24322 0

c  -2-1 --> break 
c    ( b^{367, 1}_2 ∧  b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧ -p_367) -> break
c  in CNF:
c    -b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨  b^{367, 1}_0 ∨  p_367 ∨ break
c  in DIMACS:
-24317 -24318  24319  367 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{367, 1}_2 ∧ -b^{367, 1}_1 ∧ -b^{367, 1}_0 ∧ true) 
c  in CNF:
c    -b^{367, 1}_2 ∨  b^{367, 1}_1 ∨  b^{367, 1}_0 ∨ false 
c  in DIMACS:
-24317  24318  24319  0

c  3 does not represent an automaton state.
c    -(-b^{367, 1}_2 ∧  b^{367, 1}_1 ∧  b^{367, 1}_0 ∧ true) 
c  in CNF:
c     b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ false 
c  in DIMACS:
 24317 -24318 -24319  0
c  -3 does not represent an automaton state.
c    -( b^{367, 1}_2 ∧  b^{367, 1}_1 ∧  b^{367, 1}_0 ∧ true) 
c  in CNF:
c    -b^{367, 1}_2 ∨ -b^{367, 1}_1 ∨ -b^{367, 1}_0 ∨ false 
c  in DIMACS:
-24317 -24318 -24319  0

c i = 2
c  -2+1 --> -1
c    ( b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧  p_734) -> ( b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0)
c  in CNF:
c    -b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨  b^{367, 3}_2
c    -b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_1
c    -b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨  b^{367, 3}_0
c  in DIMACS:
-24320 -24321  24322 -734  24323 0
-24320 -24321  24322 -734 -24324 0
-24320 -24321  24322 -734  24325 0

c  -1+1 --> 0
c    ( b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0 ∧  p_734) -> (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧ -b^{367, 3}_0)
c  in CNF:
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_2
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_1
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_0
c  in DIMACS:
-24320  24321 -24322 -734 -24323 0
-24320  24321 -24322 -734 -24324 0
-24320  24321 -24322 -734 -24325 0

c  0+1 --> 1
c    (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧  p_734) -> (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0)
c  in CNF:
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_2
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_1
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨  b^{367, 3}_0
c  in DIMACS:
 24320  24321  24322 -734 -24323 0
 24320  24321  24322 -734 -24324 0
 24320  24321  24322 -734  24325 0

c  1+1 --> 2
c    (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0 ∧  p_734) -> (-b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0)
c  in CNF:
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_2
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨  b^{367, 3}_1
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ -p_734 ∨ -b^{367, 3}_0
c  in DIMACS:
 24320  24321 -24322 -734 -24323 0
 24320  24321 -24322 -734  24324 0
 24320  24321 -24322 -734 -24325 0

c  2+1 --> break 
c    (-b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧  p_734) -> break
c  in CNF:
c     b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ -p_734 ∨ break
c  in DIMACS:
 24320 -24321  24322 -734 1162 0


c  2-1 --> 1
c    (-b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧ -p_734) -> (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0)
c  in CNF:
c     b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_2
c     b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_1
c     b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨  b^{367, 3}_0
c  in DIMACS:
 24320 -24321  24322  734 -24323 0
 24320 -24321  24322  734 -24324 0
 24320 -24321  24322  734  24325 0

c  1-1 --> 0
c    (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0 ∧ -p_734) -> (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧ -b^{367, 3}_0)
c  in CNF:
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_2
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_1
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_0
c  in DIMACS:
 24320  24321 -24322  734 -24323 0
 24320  24321 -24322  734 -24324 0
 24320  24321 -24322  734 -24325 0

c  0-1 --> -1
c    (-b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧ -p_734) -> ( b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0)
c  in CNF:
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨  b^{367, 3}_2
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_1
c     b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨  b^{367, 3}_0
c  in DIMACS:
 24320  24321  24322  734  24323 0
 24320  24321  24322  734 -24324 0
 24320  24321  24322  734  24325 0

c  -1-1 --> -2
c    ( b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧  b^{367, 2}_0 ∧ -p_734) -> ( b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0)
c  in CNF:
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨  b^{367, 3}_2
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨  b^{367, 3}_1
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨  p_734 ∨ -b^{367, 3}_0
c  in DIMACS:
-24320  24321 -24322  734  24323 0
-24320  24321 -24322  734  24324 0
-24320  24321 -24322  734 -24325 0

c  -2-1 --> break 
c    ( b^{367, 2}_2 ∧  b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧ -p_734) -> break
c  in CNF:
c    -b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨  b^{367, 2}_0 ∨  p_734 ∨ break
c  in DIMACS:
-24320 -24321  24322  734 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{367, 2}_2 ∧ -b^{367, 2}_1 ∧ -b^{367, 2}_0 ∧ true) 
c  in CNF:
c    -b^{367, 2}_2 ∨  b^{367, 2}_1 ∨  b^{367, 2}_0 ∨ false 
c  in DIMACS:
-24320  24321  24322  0

c  3 does not represent an automaton state.
c    -(-b^{367, 2}_2 ∧  b^{367, 2}_1 ∧  b^{367, 2}_0 ∧ true) 
c  in CNF:
c     b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ false 
c  in DIMACS:
 24320 -24321 -24322  0
c  -3 does not represent an automaton state.
c    -( b^{367, 2}_2 ∧  b^{367, 2}_1 ∧  b^{367, 2}_0 ∧ true) 
c  in CNF:
c    -b^{367, 2}_2 ∨ -b^{367, 2}_1 ∨ -b^{367, 2}_0 ∨ false 
c  in DIMACS:
-24320 -24321 -24322  0

c i = 3
c  -2+1 --> -1
c    ( b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧  p_1101) -> ( b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧  b^{367, 4}_0)
c  in CNF:
c    -b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨  b^{367, 4}_2
c    -b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_1
c    -b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨  b^{367, 4}_0
c  in DIMACS:
-24323 -24324  24325 -1101  24326 0
-24323 -24324  24325 -1101 -24327 0
-24323 -24324  24325 -1101  24328 0

c  -1+1 --> 0
c    ( b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0 ∧  p_1101) -> (-b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧ -b^{367, 4}_0)
c  in CNF:
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_2
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_1
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_0
c  in DIMACS:
-24323  24324 -24325 -1101 -24326 0
-24323  24324 -24325 -1101 -24327 0
-24323  24324 -24325 -1101 -24328 0

c  0+1 --> 1
c    (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧  p_1101) -> (-b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧  b^{367, 4}_0)
c  in CNF:
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_2
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_1
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨  b^{367, 4}_0
c  in DIMACS:
 24323  24324  24325 -1101 -24326 0
 24323  24324  24325 -1101 -24327 0
 24323  24324  24325 -1101  24328 0

c  1+1 --> 2
c    (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0 ∧  p_1101) -> (-b^{367, 4}_2 ∧  b^{367, 4}_1 ∧ -b^{367, 4}_0)
c  in CNF:
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_2
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨  b^{367, 4}_1
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ -p_1101 ∨ -b^{367, 4}_0
c  in DIMACS:
 24323  24324 -24325 -1101 -24326 0
 24323  24324 -24325 -1101  24327 0
 24323  24324 -24325 -1101 -24328 0

c  2+1 --> break 
c    (-b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧  p_1101) -> break
c  in CNF:
c     b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ -p_1101 ∨ break
c  in DIMACS:
 24323 -24324  24325 -1101 1162 0


c  2-1 --> 1
c    (-b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧ -p_1101) -> (-b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧  b^{367, 4}_0)
c  in CNF:
c     b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_2
c     b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_1
c     b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨  b^{367, 4}_0
c  in DIMACS:
 24323 -24324  24325  1101 -24326 0
 24323 -24324  24325  1101 -24327 0
 24323 -24324  24325  1101  24328 0

c  1-1 --> 0
c    (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0 ∧ -p_1101) -> (-b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧ -b^{367, 4}_0)
c  in CNF:
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_2
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_1
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_0
c  in DIMACS:
 24323  24324 -24325  1101 -24326 0
 24323  24324 -24325  1101 -24327 0
 24323  24324 -24325  1101 -24328 0

c  0-1 --> -1
c    (-b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧ -p_1101) -> ( b^{367, 4}_2 ∧ -b^{367, 4}_1 ∧  b^{367, 4}_0)
c  in CNF:
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨  b^{367, 4}_2
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_1
c     b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨  b^{367, 4}_0
c  in DIMACS:
 24323  24324  24325  1101  24326 0
 24323  24324  24325  1101 -24327 0
 24323  24324  24325  1101  24328 0

c  -1-1 --> -2
c    ( b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧  b^{367, 3}_0 ∧ -p_1101) -> ( b^{367, 4}_2 ∧  b^{367, 4}_1 ∧ -b^{367, 4}_0)
c  in CNF:
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨  b^{367, 4}_2
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨  b^{367, 4}_1
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨  p_1101 ∨ -b^{367, 4}_0
c  in DIMACS:
-24323  24324 -24325  1101  24326 0
-24323  24324 -24325  1101  24327 0
-24323  24324 -24325  1101 -24328 0

c  -2-1 --> break 
c    ( b^{367, 3}_2 ∧  b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧ -p_1101) -> break
c  in CNF:
c    -b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨  b^{367, 3}_0 ∨  p_1101 ∨ break
c  in DIMACS:
-24323 -24324  24325  1101 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{367, 3}_2 ∧ -b^{367, 3}_1 ∧ -b^{367, 3}_0 ∧ true) 
c  in CNF:
c    -b^{367, 3}_2 ∨  b^{367, 3}_1 ∨  b^{367, 3}_0 ∨ false 
c  in DIMACS:
-24323  24324  24325  0

c  3 does not represent an automaton state.
c    -(-b^{367, 3}_2 ∧  b^{367, 3}_1 ∧  b^{367, 3}_0 ∧ true) 
c  in CNF:
c     b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ false 
c  in DIMACS:
 24323 -24324 -24325  0
c  -3 does not represent an automaton state.
c    -( b^{367, 3}_2 ∧  b^{367, 3}_1 ∧  b^{367, 3}_0 ∧ true) 
c  in CNF:
c    -b^{367, 3}_2 ∨ -b^{367, 3}_1 ∨ -b^{367, 3}_0 ∨ false 
c  in DIMACS:
-24323 -24324 -24325  0

c INIT for k = 368
c    -b^{368, 1}_2
c    -b^{368, 1}_1
c    -b^{368, 1}_0
c  in DIMACS:
-24329 0
-24330 0
-24331 0

c Transitions for k = 368
c i = 1
c  -2+1 --> -1
c    ( b^{368, 1}_2 ∧  b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧  p_368) -> ( b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0)
c  in CNF:
c    -b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨  b^{368, 2}_2
c    -b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_1
c    -b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨  b^{368, 2}_0
c  in DIMACS:
-24329 -24330  24331 -368  24332 0
-24329 -24330  24331 -368 -24333 0
-24329 -24330  24331 -368  24334 0

c  -1+1 --> 0
c    ( b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧  b^{368, 1}_0 ∧  p_368) -> (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧ -b^{368, 2}_0)
c  in CNF:
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_2
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_1
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_0
c  in DIMACS:
-24329  24330 -24331 -368 -24332 0
-24329  24330 -24331 -368 -24333 0
-24329  24330 -24331 -368 -24334 0

c  0+1 --> 1
c    (-b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧  p_368) -> (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0)
c  in CNF:
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_2
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_1
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨  b^{368, 2}_0
c  in DIMACS:
 24329  24330  24331 -368 -24332 0
 24329  24330  24331 -368 -24333 0
 24329  24330  24331 -368  24334 0

c  1+1 --> 2
c    (-b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧  b^{368, 1}_0 ∧  p_368) -> (-b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0)
c  in CNF:
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_2
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨  b^{368, 2}_1
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ -p_368 ∨ -b^{368, 2}_0
c  in DIMACS:
 24329  24330 -24331 -368 -24332 0
 24329  24330 -24331 -368  24333 0
 24329  24330 -24331 -368 -24334 0

c  2+1 --> break 
c    (-b^{368, 1}_2 ∧  b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧  p_368) -> break
c  in CNF:
c     b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ -p_368 ∨ break
c  in DIMACS:
 24329 -24330  24331 -368 1162 0


c  2-1 --> 1
c    (-b^{368, 1}_2 ∧  b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧ -p_368) -> (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0)
c  in CNF:
c     b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_2
c     b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_1
c     b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨  b^{368, 2}_0
c  in DIMACS:
 24329 -24330  24331  368 -24332 0
 24329 -24330  24331  368 -24333 0
 24329 -24330  24331  368  24334 0

c  1-1 --> 0
c    (-b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧  b^{368, 1}_0 ∧ -p_368) -> (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧ -b^{368, 2}_0)
c  in CNF:
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_2
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_1
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_0
c  in DIMACS:
 24329  24330 -24331  368 -24332 0
 24329  24330 -24331  368 -24333 0
 24329  24330 -24331  368 -24334 0

c  0-1 --> -1
c    (-b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧ -p_368) -> ( b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0)
c  in CNF:
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨  b^{368, 2}_2
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_1
c     b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨  b^{368, 2}_0
c  in DIMACS:
 24329  24330  24331  368  24332 0
 24329  24330  24331  368 -24333 0
 24329  24330  24331  368  24334 0

c  -1-1 --> -2
c    ( b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧  b^{368, 1}_0 ∧ -p_368) -> ( b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0)
c  in CNF:
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨  b^{368, 2}_2
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨  b^{368, 2}_1
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨  p_368 ∨ -b^{368, 2}_0
c  in DIMACS:
-24329  24330 -24331  368  24332 0
-24329  24330 -24331  368  24333 0
-24329  24330 -24331  368 -24334 0

c  -2-1 --> break 
c    ( b^{368, 1}_2 ∧  b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧ -p_368) -> break
c  in CNF:
c    -b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨  b^{368, 1}_0 ∨  p_368 ∨ break
c  in DIMACS:
-24329 -24330  24331  368 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{368, 1}_2 ∧ -b^{368, 1}_1 ∧ -b^{368, 1}_0 ∧ true) 
c  in CNF:
c    -b^{368, 1}_2 ∨  b^{368, 1}_1 ∨  b^{368, 1}_0 ∨ false 
c  in DIMACS:
-24329  24330  24331  0

c  3 does not represent an automaton state.
c    -(-b^{368, 1}_2 ∧  b^{368, 1}_1 ∧  b^{368, 1}_0 ∧ true) 
c  in CNF:
c     b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ false 
c  in DIMACS:
 24329 -24330 -24331  0
c  -3 does not represent an automaton state.
c    -( b^{368, 1}_2 ∧  b^{368, 1}_1 ∧  b^{368, 1}_0 ∧ true) 
c  in CNF:
c    -b^{368, 1}_2 ∨ -b^{368, 1}_1 ∨ -b^{368, 1}_0 ∨ false 
c  in DIMACS:
-24329 -24330 -24331  0

c i = 2
c  -2+1 --> -1
c    ( b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧  p_736) -> ( b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0)
c  in CNF:
c    -b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨  b^{368, 3}_2
c    -b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_1
c    -b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨  b^{368, 3}_0
c  in DIMACS:
-24332 -24333  24334 -736  24335 0
-24332 -24333  24334 -736 -24336 0
-24332 -24333  24334 -736  24337 0

c  -1+1 --> 0
c    ( b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0 ∧  p_736) -> (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧ -b^{368, 3}_0)
c  in CNF:
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_2
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_1
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_0
c  in DIMACS:
-24332  24333 -24334 -736 -24335 0
-24332  24333 -24334 -736 -24336 0
-24332  24333 -24334 -736 -24337 0

c  0+1 --> 1
c    (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧  p_736) -> (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0)
c  in CNF:
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_2
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_1
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨  b^{368, 3}_0
c  in DIMACS:
 24332  24333  24334 -736 -24335 0
 24332  24333  24334 -736 -24336 0
 24332  24333  24334 -736  24337 0

c  1+1 --> 2
c    (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0 ∧  p_736) -> (-b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0)
c  in CNF:
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_2
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨  b^{368, 3}_1
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ -p_736 ∨ -b^{368, 3}_0
c  in DIMACS:
 24332  24333 -24334 -736 -24335 0
 24332  24333 -24334 -736  24336 0
 24332  24333 -24334 -736 -24337 0

c  2+1 --> break 
c    (-b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧  p_736) -> break
c  in CNF:
c     b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ -p_736 ∨ break
c  in DIMACS:
 24332 -24333  24334 -736 1162 0


c  2-1 --> 1
c    (-b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧ -p_736) -> (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0)
c  in CNF:
c     b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_2
c     b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_1
c     b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨  b^{368, 3}_0
c  in DIMACS:
 24332 -24333  24334  736 -24335 0
 24332 -24333  24334  736 -24336 0
 24332 -24333  24334  736  24337 0

c  1-1 --> 0
c    (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0 ∧ -p_736) -> (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧ -b^{368, 3}_0)
c  in CNF:
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_2
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_1
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_0
c  in DIMACS:
 24332  24333 -24334  736 -24335 0
 24332  24333 -24334  736 -24336 0
 24332  24333 -24334  736 -24337 0

c  0-1 --> -1
c    (-b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧ -p_736) -> ( b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0)
c  in CNF:
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨  b^{368, 3}_2
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_1
c     b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨  b^{368, 3}_0
c  in DIMACS:
 24332  24333  24334  736  24335 0
 24332  24333  24334  736 -24336 0
 24332  24333  24334  736  24337 0

c  -1-1 --> -2
c    ( b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧  b^{368, 2}_0 ∧ -p_736) -> ( b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0)
c  in CNF:
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨  b^{368, 3}_2
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨  b^{368, 3}_1
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨  p_736 ∨ -b^{368, 3}_0
c  in DIMACS:
-24332  24333 -24334  736  24335 0
-24332  24333 -24334  736  24336 0
-24332  24333 -24334  736 -24337 0

c  -2-1 --> break 
c    ( b^{368, 2}_2 ∧  b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧ -p_736) -> break
c  in CNF:
c    -b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨  b^{368, 2}_0 ∨  p_736 ∨ break
c  in DIMACS:
-24332 -24333  24334  736 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{368, 2}_2 ∧ -b^{368, 2}_1 ∧ -b^{368, 2}_0 ∧ true) 
c  in CNF:
c    -b^{368, 2}_2 ∨  b^{368, 2}_1 ∨  b^{368, 2}_0 ∨ false 
c  in DIMACS:
-24332  24333  24334  0

c  3 does not represent an automaton state.
c    -(-b^{368, 2}_2 ∧  b^{368, 2}_1 ∧  b^{368, 2}_0 ∧ true) 
c  in CNF:
c     b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ false 
c  in DIMACS:
 24332 -24333 -24334  0
c  -3 does not represent an automaton state.
c    -( b^{368, 2}_2 ∧  b^{368, 2}_1 ∧  b^{368, 2}_0 ∧ true) 
c  in CNF:
c    -b^{368, 2}_2 ∨ -b^{368, 2}_1 ∨ -b^{368, 2}_0 ∨ false 
c  in DIMACS:
-24332 -24333 -24334  0

c i = 3
c  -2+1 --> -1
c    ( b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧  p_1104) -> ( b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧  b^{368, 4}_0)
c  in CNF:
c    -b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨  b^{368, 4}_2
c    -b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_1
c    -b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨  b^{368, 4}_0
c  in DIMACS:
-24335 -24336  24337 -1104  24338 0
-24335 -24336  24337 -1104 -24339 0
-24335 -24336  24337 -1104  24340 0

c  -1+1 --> 0
c    ( b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0 ∧  p_1104) -> (-b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧ -b^{368, 4}_0)
c  in CNF:
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_2
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_1
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_0
c  in DIMACS:
-24335  24336 -24337 -1104 -24338 0
-24335  24336 -24337 -1104 -24339 0
-24335  24336 -24337 -1104 -24340 0

c  0+1 --> 1
c    (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧  p_1104) -> (-b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧  b^{368, 4}_0)
c  in CNF:
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_2
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_1
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨  b^{368, 4}_0
c  in DIMACS:
 24335  24336  24337 -1104 -24338 0
 24335  24336  24337 -1104 -24339 0
 24335  24336  24337 -1104  24340 0

c  1+1 --> 2
c    (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0 ∧  p_1104) -> (-b^{368, 4}_2 ∧  b^{368, 4}_1 ∧ -b^{368, 4}_0)
c  in CNF:
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_2
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨  b^{368, 4}_1
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ -p_1104 ∨ -b^{368, 4}_0
c  in DIMACS:
 24335  24336 -24337 -1104 -24338 0
 24335  24336 -24337 -1104  24339 0
 24335  24336 -24337 -1104 -24340 0

c  2+1 --> break 
c    (-b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧  p_1104) -> break
c  in CNF:
c     b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ -p_1104 ∨ break
c  in DIMACS:
 24335 -24336  24337 -1104 1162 0


c  2-1 --> 1
c    (-b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧ -p_1104) -> (-b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧  b^{368, 4}_0)
c  in CNF:
c     b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_2
c     b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_1
c     b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨  b^{368, 4}_0
c  in DIMACS:
 24335 -24336  24337  1104 -24338 0
 24335 -24336  24337  1104 -24339 0
 24335 -24336  24337  1104  24340 0

c  1-1 --> 0
c    (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0 ∧ -p_1104) -> (-b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧ -b^{368, 4}_0)
c  in CNF:
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_2
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_1
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_0
c  in DIMACS:
 24335  24336 -24337  1104 -24338 0
 24335  24336 -24337  1104 -24339 0
 24335  24336 -24337  1104 -24340 0

c  0-1 --> -1
c    (-b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧ -p_1104) -> ( b^{368, 4}_2 ∧ -b^{368, 4}_1 ∧  b^{368, 4}_0)
c  in CNF:
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨  b^{368, 4}_2
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_1
c     b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨  b^{368, 4}_0
c  in DIMACS:
 24335  24336  24337  1104  24338 0
 24335  24336  24337  1104 -24339 0
 24335  24336  24337  1104  24340 0

c  -1-1 --> -2
c    ( b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧  b^{368, 3}_0 ∧ -p_1104) -> ( b^{368, 4}_2 ∧  b^{368, 4}_1 ∧ -b^{368, 4}_0)
c  in CNF:
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨  b^{368, 4}_2
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨  b^{368, 4}_1
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨  p_1104 ∨ -b^{368, 4}_0
c  in DIMACS:
-24335  24336 -24337  1104  24338 0
-24335  24336 -24337  1104  24339 0
-24335  24336 -24337  1104 -24340 0

c  -2-1 --> break 
c    ( b^{368, 3}_2 ∧  b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧ -p_1104) -> break
c  in CNF:
c    -b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨  b^{368, 3}_0 ∨  p_1104 ∨ break
c  in DIMACS:
-24335 -24336  24337  1104 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{368, 3}_2 ∧ -b^{368, 3}_1 ∧ -b^{368, 3}_0 ∧ true) 
c  in CNF:
c    -b^{368, 3}_2 ∨  b^{368, 3}_1 ∨  b^{368, 3}_0 ∨ false 
c  in DIMACS:
-24335  24336  24337  0

c  3 does not represent an automaton state.
c    -(-b^{368, 3}_2 ∧  b^{368, 3}_1 ∧  b^{368, 3}_0 ∧ true) 
c  in CNF:
c     b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ false 
c  in DIMACS:
 24335 -24336 -24337  0
c  -3 does not represent an automaton state.
c    -( b^{368, 3}_2 ∧  b^{368, 3}_1 ∧  b^{368, 3}_0 ∧ true) 
c  in CNF:
c    -b^{368, 3}_2 ∨ -b^{368, 3}_1 ∨ -b^{368, 3}_0 ∨ false 
c  in DIMACS:
-24335 -24336 -24337  0

c INIT for k = 369
c    -b^{369, 1}_2
c    -b^{369, 1}_1
c    -b^{369, 1}_0
c  in DIMACS:
-24341 0
-24342 0
-24343 0

c Transitions for k = 369
c i = 1
c  -2+1 --> -1
c    ( b^{369, 1}_2 ∧  b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧  p_369) -> ( b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0)
c  in CNF:
c    -b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨  b^{369, 2}_2
c    -b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_1
c    -b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨  b^{369, 2}_0
c  in DIMACS:
-24341 -24342  24343 -369  24344 0
-24341 -24342  24343 -369 -24345 0
-24341 -24342  24343 -369  24346 0

c  -1+1 --> 0
c    ( b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧  b^{369, 1}_0 ∧  p_369) -> (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧ -b^{369, 2}_0)
c  in CNF:
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_2
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_1
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_0
c  in DIMACS:
-24341  24342 -24343 -369 -24344 0
-24341  24342 -24343 -369 -24345 0
-24341  24342 -24343 -369 -24346 0

c  0+1 --> 1
c    (-b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧  p_369) -> (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0)
c  in CNF:
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_2
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_1
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨  b^{369, 2}_0
c  in DIMACS:
 24341  24342  24343 -369 -24344 0
 24341  24342  24343 -369 -24345 0
 24341  24342  24343 -369  24346 0

c  1+1 --> 2
c    (-b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧  b^{369, 1}_0 ∧  p_369) -> (-b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0)
c  in CNF:
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_2
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨  b^{369, 2}_1
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ -p_369 ∨ -b^{369, 2}_0
c  in DIMACS:
 24341  24342 -24343 -369 -24344 0
 24341  24342 -24343 -369  24345 0
 24341  24342 -24343 -369 -24346 0

c  2+1 --> break 
c    (-b^{369, 1}_2 ∧  b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧  p_369) -> break
c  in CNF:
c     b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ -p_369 ∨ break
c  in DIMACS:
 24341 -24342  24343 -369 1162 0


c  2-1 --> 1
c    (-b^{369, 1}_2 ∧  b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧ -p_369) -> (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0)
c  in CNF:
c     b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_2
c     b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_1
c     b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨  b^{369, 2}_0
c  in DIMACS:
 24341 -24342  24343  369 -24344 0
 24341 -24342  24343  369 -24345 0
 24341 -24342  24343  369  24346 0

c  1-1 --> 0
c    (-b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧  b^{369, 1}_0 ∧ -p_369) -> (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧ -b^{369, 2}_0)
c  in CNF:
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_2
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_1
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_0
c  in DIMACS:
 24341  24342 -24343  369 -24344 0
 24341  24342 -24343  369 -24345 0
 24341  24342 -24343  369 -24346 0

c  0-1 --> -1
c    (-b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧ -p_369) -> ( b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0)
c  in CNF:
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨  b^{369, 2}_2
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_1
c     b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨  b^{369, 2}_0
c  in DIMACS:
 24341  24342  24343  369  24344 0
 24341  24342  24343  369 -24345 0
 24341  24342  24343  369  24346 0

c  -1-1 --> -2
c    ( b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧  b^{369, 1}_0 ∧ -p_369) -> ( b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0)
c  in CNF:
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨  b^{369, 2}_2
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨  b^{369, 2}_1
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨  p_369 ∨ -b^{369, 2}_0
c  in DIMACS:
-24341  24342 -24343  369  24344 0
-24341  24342 -24343  369  24345 0
-24341  24342 -24343  369 -24346 0

c  -2-1 --> break 
c    ( b^{369, 1}_2 ∧  b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧ -p_369) -> break
c  in CNF:
c    -b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨  b^{369, 1}_0 ∨  p_369 ∨ break
c  in DIMACS:
-24341 -24342  24343  369 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{369, 1}_2 ∧ -b^{369, 1}_1 ∧ -b^{369, 1}_0 ∧ true) 
c  in CNF:
c    -b^{369, 1}_2 ∨  b^{369, 1}_1 ∨  b^{369, 1}_0 ∨ false 
c  in DIMACS:
-24341  24342  24343  0

c  3 does not represent an automaton state.
c    -(-b^{369, 1}_2 ∧  b^{369, 1}_1 ∧  b^{369, 1}_0 ∧ true) 
c  in CNF:
c     b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ false 
c  in DIMACS:
 24341 -24342 -24343  0
c  -3 does not represent an automaton state.
c    -( b^{369, 1}_2 ∧  b^{369, 1}_1 ∧  b^{369, 1}_0 ∧ true) 
c  in CNF:
c    -b^{369, 1}_2 ∨ -b^{369, 1}_1 ∨ -b^{369, 1}_0 ∨ false 
c  in DIMACS:
-24341 -24342 -24343  0

c i = 2
c  -2+1 --> -1
c    ( b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧  p_738) -> ( b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0)
c  in CNF:
c    -b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨  b^{369, 3}_2
c    -b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_1
c    -b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨  b^{369, 3}_0
c  in DIMACS:
-24344 -24345  24346 -738  24347 0
-24344 -24345  24346 -738 -24348 0
-24344 -24345  24346 -738  24349 0

c  -1+1 --> 0
c    ( b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0 ∧  p_738) -> (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧ -b^{369, 3}_0)
c  in CNF:
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_2
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_1
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_0
c  in DIMACS:
-24344  24345 -24346 -738 -24347 0
-24344  24345 -24346 -738 -24348 0
-24344  24345 -24346 -738 -24349 0

c  0+1 --> 1
c    (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧  p_738) -> (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0)
c  in CNF:
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_2
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_1
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨  b^{369, 3}_0
c  in DIMACS:
 24344  24345  24346 -738 -24347 0
 24344  24345  24346 -738 -24348 0
 24344  24345  24346 -738  24349 0

c  1+1 --> 2
c    (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0 ∧  p_738) -> (-b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0)
c  in CNF:
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_2
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨  b^{369, 3}_1
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ -p_738 ∨ -b^{369, 3}_0
c  in DIMACS:
 24344  24345 -24346 -738 -24347 0
 24344  24345 -24346 -738  24348 0
 24344  24345 -24346 -738 -24349 0

c  2+1 --> break 
c    (-b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧  p_738) -> break
c  in CNF:
c     b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ -p_738 ∨ break
c  in DIMACS:
 24344 -24345  24346 -738 1162 0


c  2-1 --> 1
c    (-b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧ -p_738) -> (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0)
c  in CNF:
c     b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_2
c     b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_1
c     b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨  b^{369, 3}_0
c  in DIMACS:
 24344 -24345  24346  738 -24347 0
 24344 -24345  24346  738 -24348 0
 24344 -24345  24346  738  24349 0

c  1-1 --> 0
c    (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0 ∧ -p_738) -> (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧ -b^{369, 3}_0)
c  in CNF:
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_2
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_1
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_0
c  in DIMACS:
 24344  24345 -24346  738 -24347 0
 24344  24345 -24346  738 -24348 0
 24344  24345 -24346  738 -24349 0

c  0-1 --> -1
c    (-b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧ -p_738) -> ( b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0)
c  in CNF:
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨  b^{369, 3}_2
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_1
c     b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨  b^{369, 3}_0
c  in DIMACS:
 24344  24345  24346  738  24347 0
 24344  24345  24346  738 -24348 0
 24344  24345  24346  738  24349 0

c  -1-1 --> -2
c    ( b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧  b^{369, 2}_0 ∧ -p_738) -> ( b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0)
c  in CNF:
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨  b^{369, 3}_2
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨  b^{369, 3}_1
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨  p_738 ∨ -b^{369, 3}_0
c  in DIMACS:
-24344  24345 -24346  738  24347 0
-24344  24345 -24346  738  24348 0
-24344  24345 -24346  738 -24349 0

c  -2-1 --> break 
c    ( b^{369, 2}_2 ∧  b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧ -p_738) -> break
c  in CNF:
c    -b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨  b^{369, 2}_0 ∨  p_738 ∨ break
c  in DIMACS:
-24344 -24345  24346  738 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{369, 2}_2 ∧ -b^{369, 2}_1 ∧ -b^{369, 2}_0 ∧ true) 
c  in CNF:
c    -b^{369, 2}_2 ∨  b^{369, 2}_1 ∨  b^{369, 2}_0 ∨ false 
c  in DIMACS:
-24344  24345  24346  0

c  3 does not represent an automaton state.
c    -(-b^{369, 2}_2 ∧  b^{369, 2}_1 ∧  b^{369, 2}_0 ∧ true) 
c  in CNF:
c     b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ false 
c  in DIMACS:
 24344 -24345 -24346  0
c  -3 does not represent an automaton state.
c    -( b^{369, 2}_2 ∧  b^{369, 2}_1 ∧  b^{369, 2}_0 ∧ true) 
c  in CNF:
c    -b^{369, 2}_2 ∨ -b^{369, 2}_1 ∨ -b^{369, 2}_0 ∨ false 
c  in DIMACS:
-24344 -24345 -24346  0

c i = 3
c  -2+1 --> -1
c    ( b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧  p_1107) -> ( b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧  b^{369, 4}_0)
c  in CNF:
c    -b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨  b^{369, 4}_2
c    -b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_1
c    -b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨  b^{369, 4}_0
c  in DIMACS:
-24347 -24348  24349 -1107  24350 0
-24347 -24348  24349 -1107 -24351 0
-24347 -24348  24349 -1107  24352 0

c  -1+1 --> 0
c    ( b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0 ∧  p_1107) -> (-b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧ -b^{369, 4}_0)
c  in CNF:
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_2
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_1
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_0
c  in DIMACS:
-24347  24348 -24349 -1107 -24350 0
-24347  24348 -24349 -1107 -24351 0
-24347  24348 -24349 -1107 -24352 0

c  0+1 --> 1
c    (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧  p_1107) -> (-b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧  b^{369, 4}_0)
c  in CNF:
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_2
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_1
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨  b^{369, 4}_0
c  in DIMACS:
 24347  24348  24349 -1107 -24350 0
 24347  24348  24349 -1107 -24351 0
 24347  24348  24349 -1107  24352 0

c  1+1 --> 2
c    (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0 ∧  p_1107) -> (-b^{369, 4}_2 ∧  b^{369, 4}_1 ∧ -b^{369, 4}_0)
c  in CNF:
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_2
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨  b^{369, 4}_1
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ -p_1107 ∨ -b^{369, 4}_0
c  in DIMACS:
 24347  24348 -24349 -1107 -24350 0
 24347  24348 -24349 -1107  24351 0
 24347  24348 -24349 -1107 -24352 0

c  2+1 --> break 
c    (-b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧  p_1107) -> break
c  in CNF:
c     b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ -p_1107 ∨ break
c  in DIMACS:
 24347 -24348  24349 -1107 1162 0


c  2-1 --> 1
c    (-b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧ -p_1107) -> (-b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧  b^{369, 4}_0)
c  in CNF:
c     b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_2
c     b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_1
c     b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨  b^{369, 4}_0
c  in DIMACS:
 24347 -24348  24349  1107 -24350 0
 24347 -24348  24349  1107 -24351 0
 24347 -24348  24349  1107  24352 0

c  1-1 --> 0
c    (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0 ∧ -p_1107) -> (-b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧ -b^{369, 4}_0)
c  in CNF:
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_2
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_1
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_0
c  in DIMACS:
 24347  24348 -24349  1107 -24350 0
 24347  24348 -24349  1107 -24351 0
 24347  24348 -24349  1107 -24352 0

c  0-1 --> -1
c    (-b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧ -p_1107) -> ( b^{369, 4}_2 ∧ -b^{369, 4}_1 ∧  b^{369, 4}_0)
c  in CNF:
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨  b^{369, 4}_2
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_1
c     b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨  b^{369, 4}_0
c  in DIMACS:
 24347  24348  24349  1107  24350 0
 24347  24348  24349  1107 -24351 0
 24347  24348  24349  1107  24352 0

c  -1-1 --> -2
c    ( b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧  b^{369, 3}_0 ∧ -p_1107) -> ( b^{369, 4}_2 ∧  b^{369, 4}_1 ∧ -b^{369, 4}_0)
c  in CNF:
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨  b^{369, 4}_2
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨  b^{369, 4}_1
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨  p_1107 ∨ -b^{369, 4}_0
c  in DIMACS:
-24347  24348 -24349  1107  24350 0
-24347  24348 -24349  1107  24351 0
-24347  24348 -24349  1107 -24352 0

c  -2-1 --> break 
c    ( b^{369, 3}_2 ∧  b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧ -p_1107) -> break
c  in CNF:
c    -b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨  b^{369, 3}_0 ∨  p_1107 ∨ break
c  in DIMACS:
-24347 -24348  24349  1107 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{369, 3}_2 ∧ -b^{369, 3}_1 ∧ -b^{369, 3}_0 ∧ true) 
c  in CNF:
c    -b^{369, 3}_2 ∨  b^{369, 3}_1 ∨  b^{369, 3}_0 ∨ false 
c  in DIMACS:
-24347  24348  24349  0

c  3 does not represent an automaton state.
c    -(-b^{369, 3}_2 ∧  b^{369, 3}_1 ∧  b^{369, 3}_0 ∧ true) 
c  in CNF:
c     b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ false 
c  in DIMACS:
 24347 -24348 -24349  0
c  -3 does not represent an automaton state.
c    -( b^{369, 3}_2 ∧  b^{369, 3}_1 ∧  b^{369, 3}_0 ∧ true) 
c  in CNF:
c    -b^{369, 3}_2 ∨ -b^{369, 3}_1 ∨ -b^{369, 3}_0 ∨ false 
c  in DIMACS:
-24347 -24348 -24349  0

c INIT for k = 370
c    -b^{370, 1}_2
c    -b^{370, 1}_1
c    -b^{370, 1}_0
c  in DIMACS:
-24353 0
-24354 0
-24355 0

c Transitions for k = 370
c i = 1
c  -2+1 --> -1
c    ( b^{370, 1}_2 ∧  b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧  p_370) -> ( b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0)
c  in CNF:
c    -b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨  b^{370, 2}_2
c    -b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_1
c    -b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨  b^{370, 2}_0
c  in DIMACS:
-24353 -24354  24355 -370  24356 0
-24353 -24354  24355 -370 -24357 0
-24353 -24354  24355 -370  24358 0

c  -1+1 --> 0
c    ( b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧  b^{370, 1}_0 ∧  p_370) -> (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧ -b^{370, 2}_0)
c  in CNF:
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_2
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_1
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_0
c  in DIMACS:
-24353  24354 -24355 -370 -24356 0
-24353  24354 -24355 -370 -24357 0
-24353  24354 -24355 -370 -24358 0

c  0+1 --> 1
c    (-b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧  p_370) -> (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0)
c  in CNF:
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_2
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_1
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨  b^{370, 2}_0
c  in DIMACS:
 24353  24354  24355 -370 -24356 0
 24353  24354  24355 -370 -24357 0
 24353  24354  24355 -370  24358 0

c  1+1 --> 2
c    (-b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧  b^{370, 1}_0 ∧  p_370) -> (-b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0)
c  in CNF:
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_2
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨  b^{370, 2}_1
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ -p_370 ∨ -b^{370, 2}_0
c  in DIMACS:
 24353  24354 -24355 -370 -24356 0
 24353  24354 -24355 -370  24357 0
 24353  24354 -24355 -370 -24358 0

c  2+1 --> break 
c    (-b^{370, 1}_2 ∧  b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧  p_370) -> break
c  in CNF:
c     b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ -p_370 ∨ break
c  in DIMACS:
 24353 -24354  24355 -370 1162 0


c  2-1 --> 1
c    (-b^{370, 1}_2 ∧  b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧ -p_370) -> (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0)
c  in CNF:
c     b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_2
c     b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_1
c     b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨  b^{370, 2}_0
c  in DIMACS:
 24353 -24354  24355  370 -24356 0
 24353 -24354  24355  370 -24357 0
 24353 -24354  24355  370  24358 0

c  1-1 --> 0
c    (-b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧  b^{370, 1}_0 ∧ -p_370) -> (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧ -b^{370, 2}_0)
c  in CNF:
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_2
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_1
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_0
c  in DIMACS:
 24353  24354 -24355  370 -24356 0
 24353  24354 -24355  370 -24357 0
 24353  24354 -24355  370 -24358 0

c  0-1 --> -1
c    (-b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧ -p_370) -> ( b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0)
c  in CNF:
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨  b^{370, 2}_2
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_1
c     b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨  b^{370, 2}_0
c  in DIMACS:
 24353  24354  24355  370  24356 0
 24353  24354  24355  370 -24357 0
 24353  24354  24355  370  24358 0

c  -1-1 --> -2
c    ( b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧  b^{370, 1}_0 ∧ -p_370) -> ( b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0)
c  in CNF:
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨  b^{370, 2}_2
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨  b^{370, 2}_1
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨  p_370 ∨ -b^{370, 2}_0
c  in DIMACS:
-24353  24354 -24355  370  24356 0
-24353  24354 -24355  370  24357 0
-24353  24354 -24355  370 -24358 0

c  -2-1 --> break 
c    ( b^{370, 1}_2 ∧  b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧ -p_370) -> break
c  in CNF:
c    -b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨  b^{370, 1}_0 ∨  p_370 ∨ break
c  in DIMACS:
-24353 -24354  24355  370 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{370, 1}_2 ∧ -b^{370, 1}_1 ∧ -b^{370, 1}_0 ∧ true) 
c  in CNF:
c    -b^{370, 1}_2 ∨  b^{370, 1}_1 ∨  b^{370, 1}_0 ∨ false 
c  in DIMACS:
-24353  24354  24355  0

c  3 does not represent an automaton state.
c    -(-b^{370, 1}_2 ∧  b^{370, 1}_1 ∧  b^{370, 1}_0 ∧ true) 
c  in CNF:
c     b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ false 
c  in DIMACS:
 24353 -24354 -24355  0
c  -3 does not represent an automaton state.
c    -( b^{370, 1}_2 ∧  b^{370, 1}_1 ∧  b^{370, 1}_0 ∧ true) 
c  in CNF:
c    -b^{370, 1}_2 ∨ -b^{370, 1}_1 ∨ -b^{370, 1}_0 ∨ false 
c  in DIMACS:
-24353 -24354 -24355  0

c i = 2
c  -2+1 --> -1
c    ( b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧  p_740) -> ( b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0)
c  in CNF:
c    -b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨  b^{370, 3}_2
c    -b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_1
c    -b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨  b^{370, 3}_0
c  in DIMACS:
-24356 -24357  24358 -740  24359 0
-24356 -24357  24358 -740 -24360 0
-24356 -24357  24358 -740  24361 0

c  -1+1 --> 0
c    ( b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0 ∧  p_740) -> (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧ -b^{370, 3}_0)
c  in CNF:
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_2
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_1
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_0
c  in DIMACS:
-24356  24357 -24358 -740 -24359 0
-24356  24357 -24358 -740 -24360 0
-24356  24357 -24358 -740 -24361 0

c  0+1 --> 1
c    (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧  p_740) -> (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0)
c  in CNF:
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_2
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_1
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨  b^{370, 3}_0
c  in DIMACS:
 24356  24357  24358 -740 -24359 0
 24356  24357  24358 -740 -24360 0
 24356  24357  24358 -740  24361 0

c  1+1 --> 2
c    (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0 ∧  p_740) -> (-b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0)
c  in CNF:
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_2
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨  b^{370, 3}_1
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ -p_740 ∨ -b^{370, 3}_0
c  in DIMACS:
 24356  24357 -24358 -740 -24359 0
 24356  24357 -24358 -740  24360 0
 24356  24357 -24358 -740 -24361 0

c  2+1 --> break 
c    (-b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧  p_740) -> break
c  in CNF:
c     b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ -p_740 ∨ break
c  in DIMACS:
 24356 -24357  24358 -740 1162 0


c  2-1 --> 1
c    (-b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧ -p_740) -> (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0)
c  in CNF:
c     b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_2
c     b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_1
c     b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨  b^{370, 3}_0
c  in DIMACS:
 24356 -24357  24358  740 -24359 0
 24356 -24357  24358  740 -24360 0
 24356 -24357  24358  740  24361 0

c  1-1 --> 0
c    (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0 ∧ -p_740) -> (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧ -b^{370, 3}_0)
c  in CNF:
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_2
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_1
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_0
c  in DIMACS:
 24356  24357 -24358  740 -24359 0
 24356  24357 -24358  740 -24360 0
 24356  24357 -24358  740 -24361 0

c  0-1 --> -1
c    (-b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧ -p_740) -> ( b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0)
c  in CNF:
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨  b^{370, 3}_2
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_1
c     b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨  b^{370, 3}_0
c  in DIMACS:
 24356  24357  24358  740  24359 0
 24356  24357  24358  740 -24360 0
 24356  24357  24358  740  24361 0

c  -1-1 --> -2
c    ( b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧  b^{370, 2}_0 ∧ -p_740) -> ( b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0)
c  in CNF:
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨  b^{370, 3}_2
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨  b^{370, 3}_1
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨  p_740 ∨ -b^{370, 3}_0
c  in DIMACS:
-24356  24357 -24358  740  24359 0
-24356  24357 -24358  740  24360 0
-24356  24357 -24358  740 -24361 0

c  -2-1 --> break 
c    ( b^{370, 2}_2 ∧  b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧ -p_740) -> break
c  in CNF:
c    -b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨  b^{370, 2}_0 ∨  p_740 ∨ break
c  in DIMACS:
-24356 -24357  24358  740 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{370, 2}_2 ∧ -b^{370, 2}_1 ∧ -b^{370, 2}_0 ∧ true) 
c  in CNF:
c    -b^{370, 2}_2 ∨  b^{370, 2}_1 ∨  b^{370, 2}_0 ∨ false 
c  in DIMACS:
-24356  24357  24358  0

c  3 does not represent an automaton state.
c    -(-b^{370, 2}_2 ∧  b^{370, 2}_1 ∧  b^{370, 2}_0 ∧ true) 
c  in CNF:
c     b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ false 
c  in DIMACS:
 24356 -24357 -24358  0
c  -3 does not represent an automaton state.
c    -( b^{370, 2}_2 ∧  b^{370, 2}_1 ∧  b^{370, 2}_0 ∧ true) 
c  in CNF:
c    -b^{370, 2}_2 ∨ -b^{370, 2}_1 ∨ -b^{370, 2}_0 ∨ false 
c  in DIMACS:
-24356 -24357 -24358  0

c i = 3
c  -2+1 --> -1
c    ( b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧  p_1110) -> ( b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧  b^{370, 4}_0)
c  in CNF:
c    -b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨  b^{370, 4}_2
c    -b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_1
c    -b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨  b^{370, 4}_0
c  in DIMACS:
-24359 -24360  24361 -1110  24362 0
-24359 -24360  24361 -1110 -24363 0
-24359 -24360  24361 -1110  24364 0

c  -1+1 --> 0
c    ( b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0 ∧  p_1110) -> (-b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧ -b^{370, 4}_0)
c  in CNF:
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_2
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_1
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_0
c  in DIMACS:
-24359  24360 -24361 -1110 -24362 0
-24359  24360 -24361 -1110 -24363 0
-24359  24360 -24361 -1110 -24364 0

c  0+1 --> 1
c    (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧  p_1110) -> (-b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧  b^{370, 4}_0)
c  in CNF:
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_2
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_1
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨  b^{370, 4}_0
c  in DIMACS:
 24359  24360  24361 -1110 -24362 0
 24359  24360  24361 -1110 -24363 0
 24359  24360  24361 -1110  24364 0

c  1+1 --> 2
c    (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0 ∧  p_1110) -> (-b^{370, 4}_2 ∧  b^{370, 4}_1 ∧ -b^{370, 4}_0)
c  in CNF:
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_2
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨  b^{370, 4}_1
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ -p_1110 ∨ -b^{370, 4}_0
c  in DIMACS:
 24359  24360 -24361 -1110 -24362 0
 24359  24360 -24361 -1110  24363 0
 24359  24360 -24361 -1110 -24364 0

c  2+1 --> break 
c    (-b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧  p_1110) -> break
c  in CNF:
c     b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ -p_1110 ∨ break
c  in DIMACS:
 24359 -24360  24361 -1110 1162 0


c  2-1 --> 1
c    (-b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧ -p_1110) -> (-b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧  b^{370, 4}_0)
c  in CNF:
c     b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_2
c     b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_1
c     b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨  b^{370, 4}_0
c  in DIMACS:
 24359 -24360  24361  1110 -24362 0
 24359 -24360  24361  1110 -24363 0
 24359 -24360  24361  1110  24364 0

c  1-1 --> 0
c    (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0 ∧ -p_1110) -> (-b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧ -b^{370, 4}_0)
c  in CNF:
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_2
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_1
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_0
c  in DIMACS:
 24359  24360 -24361  1110 -24362 0
 24359  24360 -24361  1110 -24363 0
 24359  24360 -24361  1110 -24364 0

c  0-1 --> -1
c    (-b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧ -p_1110) -> ( b^{370, 4}_2 ∧ -b^{370, 4}_1 ∧  b^{370, 4}_0)
c  in CNF:
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨  b^{370, 4}_2
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_1
c     b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨  b^{370, 4}_0
c  in DIMACS:
 24359  24360  24361  1110  24362 0
 24359  24360  24361  1110 -24363 0
 24359  24360  24361  1110  24364 0

c  -1-1 --> -2
c    ( b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧  b^{370, 3}_0 ∧ -p_1110) -> ( b^{370, 4}_2 ∧  b^{370, 4}_1 ∧ -b^{370, 4}_0)
c  in CNF:
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨  b^{370, 4}_2
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨  b^{370, 4}_1
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨  p_1110 ∨ -b^{370, 4}_0
c  in DIMACS:
-24359  24360 -24361  1110  24362 0
-24359  24360 -24361  1110  24363 0
-24359  24360 -24361  1110 -24364 0

c  -2-1 --> break 
c    ( b^{370, 3}_2 ∧  b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧ -p_1110) -> break
c  in CNF:
c    -b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨  b^{370, 3}_0 ∨  p_1110 ∨ break
c  in DIMACS:
-24359 -24360  24361  1110 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{370, 3}_2 ∧ -b^{370, 3}_1 ∧ -b^{370, 3}_0 ∧ true) 
c  in CNF:
c    -b^{370, 3}_2 ∨  b^{370, 3}_1 ∨  b^{370, 3}_0 ∨ false 
c  in DIMACS:
-24359  24360  24361  0

c  3 does not represent an automaton state.
c    -(-b^{370, 3}_2 ∧  b^{370, 3}_1 ∧  b^{370, 3}_0 ∧ true) 
c  in CNF:
c     b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ false 
c  in DIMACS:
 24359 -24360 -24361  0
c  -3 does not represent an automaton state.
c    -( b^{370, 3}_2 ∧  b^{370, 3}_1 ∧  b^{370, 3}_0 ∧ true) 
c  in CNF:
c    -b^{370, 3}_2 ∨ -b^{370, 3}_1 ∨ -b^{370, 3}_0 ∨ false 
c  in DIMACS:
-24359 -24360 -24361  0

c INIT for k = 371
c    -b^{371, 1}_2
c    -b^{371, 1}_1
c    -b^{371, 1}_0
c  in DIMACS:
-24365 0
-24366 0
-24367 0

c Transitions for k = 371
c i = 1
c  -2+1 --> -1
c    ( b^{371, 1}_2 ∧  b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧  p_371) -> ( b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0)
c  in CNF:
c    -b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨  b^{371, 2}_2
c    -b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_1
c    -b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨  b^{371, 2}_0
c  in DIMACS:
-24365 -24366  24367 -371  24368 0
-24365 -24366  24367 -371 -24369 0
-24365 -24366  24367 -371  24370 0

c  -1+1 --> 0
c    ( b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧  b^{371, 1}_0 ∧  p_371) -> (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧ -b^{371, 2}_0)
c  in CNF:
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_2
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_1
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_0
c  in DIMACS:
-24365  24366 -24367 -371 -24368 0
-24365  24366 -24367 -371 -24369 0
-24365  24366 -24367 -371 -24370 0

c  0+1 --> 1
c    (-b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧  p_371) -> (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0)
c  in CNF:
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_2
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_1
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨  b^{371, 2}_0
c  in DIMACS:
 24365  24366  24367 -371 -24368 0
 24365  24366  24367 -371 -24369 0
 24365  24366  24367 -371  24370 0

c  1+1 --> 2
c    (-b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧  b^{371, 1}_0 ∧  p_371) -> (-b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0)
c  in CNF:
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_2
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨  b^{371, 2}_1
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ -p_371 ∨ -b^{371, 2}_0
c  in DIMACS:
 24365  24366 -24367 -371 -24368 0
 24365  24366 -24367 -371  24369 0
 24365  24366 -24367 -371 -24370 0

c  2+1 --> break 
c    (-b^{371, 1}_2 ∧  b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧  p_371) -> break
c  in CNF:
c     b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ -p_371 ∨ break
c  in DIMACS:
 24365 -24366  24367 -371 1162 0


c  2-1 --> 1
c    (-b^{371, 1}_2 ∧  b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧ -p_371) -> (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0)
c  in CNF:
c     b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_2
c     b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_1
c     b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨  b^{371, 2}_0
c  in DIMACS:
 24365 -24366  24367  371 -24368 0
 24365 -24366  24367  371 -24369 0
 24365 -24366  24367  371  24370 0

c  1-1 --> 0
c    (-b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧  b^{371, 1}_0 ∧ -p_371) -> (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧ -b^{371, 2}_0)
c  in CNF:
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_2
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_1
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_0
c  in DIMACS:
 24365  24366 -24367  371 -24368 0
 24365  24366 -24367  371 -24369 0
 24365  24366 -24367  371 -24370 0

c  0-1 --> -1
c    (-b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧ -p_371) -> ( b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0)
c  in CNF:
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨  b^{371, 2}_2
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_1
c     b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨  b^{371, 2}_0
c  in DIMACS:
 24365  24366  24367  371  24368 0
 24365  24366  24367  371 -24369 0
 24365  24366  24367  371  24370 0

c  -1-1 --> -2
c    ( b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧  b^{371, 1}_0 ∧ -p_371) -> ( b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0)
c  in CNF:
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨  b^{371, 2}_2
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨  b^{371, 2}_1
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨  p_371 ∨ -b^{371, 2}_0
c  in DIMACS:
-24365  24366 -24367  371  24368 0
-24365  24366 -24367  371  24369 0
-24365  24366 -24367  371 -24370 0

c  -2-1 --> break 
c    ( b^{371, 1}_2 ∧  b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧ -p_371) -> break
c  in CNF:
c    -b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨  b^{371, 1}_0 ∨  p_371 ∨ break
c  in DIMACS:
-24365 -24366  24367  371 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{371, 1}_2 ∧ -b^{371, 1}_1 ∧ -b^{371, 1}_0 ∧ true) 
c  in CNF:
c    -b^{371, 1}_2 ∨  b^{371, 1}_1 ∨  b^{371, 1}_0 ∨ false 
c  in DIMACS:
-24365  24366  24367  0

c  3 does not represent an automaton state.
c    -(-b^{371, 1}_2 ∧  b^{371, 1}_1 ∧  b^{371, 1}_0 ∧ true) 
c  in CNF:
c     b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ false 
c  in DIMACS:
 24365 -24366 -24367  0
c  -3 does not represent an automaton state.
c    -( b^{371, 1}_2 ∧  b^{371, 1}_1 ∧  b^{371, 1}_0 ∧ true) 
c  in CNF:
c    -b^{371, 1}_2 ∨ -b^{371, 1}_1 ∨ -b^{371, 1}_0 ∨ false 
c  in DIMACS:
-24365 -24366 -24367  0

c i = 2
c  -2+1 --> -1
c    ( b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧  p_742) -> ( b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0)
c  in CNF:
c    -b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨  b^{371, 3}_2
c    -b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_1
c    -b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨  b^{371, 3}_0
c  in DIMACS:
-24368 -24369  24370 -742  24371 0
-24368 -24369  24370 -742 -24372 0
-24368 -24369  24370 -742  24373 0

c  -1+1 --> 0
c    ( b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0 ∧  p_742) -> (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧ -b^{371, 3}_0)
c  in CNF:
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_2
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_1
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_0
c  in DIMACS:
-24368  24369 -24370 -742 -24371 0
-24368  24369 -24370 -742 -24372 0
-24368  24369 -24370 -742 -24373 0

c  0+1 --> 1
c    (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧  p_742) -> (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0)
c  in CNF:
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_2
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_1
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨  b^{371, 3}_0
c  in DIMACS:
 24368  24369  24370 -742 -24371 0
 24368  24369  24370 -742 -24372 0
 24368  24369  24370 -742  24373 0

c  1+1 --> 2
c    (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0 ∧  p_742) -> (-b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0)
c  in CNF:
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_2
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨  b^{371, 3}_1
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ -p_742 ∨ -b^{371, 3}_0
c  in DIMACS:
 24368  24369 -24370 -742 -24371 0
 24368  24369 -24370 -742  24372 0
 24368  24369 -24370 -742 -24373 0

c  2+1 --> break 
c    (-b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧  p_742) -> break
c  in CNF:
c     b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ -p_742 ∨ break
c  in DIMACS:
 24368 -24369  24370 -742 1162 0


c  2-1 --> 1
c    (-b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧ -p_742) -> (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0)
c  in CNF:
c     b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_2
c     b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_1
c     b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨  b^{371, 3}_0
c  in DIMACS:
 24368 -24369  24370  742 -24371 0
 24368 -24369  24370  742 -24372 0
 24368 -24369  24370  742  24373 0

c  1-1 --> 0
c    (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0 ∧ -p_742) -> (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧ -b^{371, 3}_0)
c  in CNF:
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_2
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_1
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_0
c  in DIMACS:
 24368  24369 -24370  742 -24371 0
 24368  24369 -24370  742 -24372 0
 24368  24369 -24370  742 -24373 0

c  0-1 --> -1
c    (-b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧ -p_742) -> ( b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0)
c  in CNF:
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨  b^{371, 3}_2
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_1
c     b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨  b^{371, 3}_0
c  in DIMACS:
 24368  24369  24370  742  24371 0
 24368  24369  24370  742 -24372 0
 24368  24369  24370  742  24373 0

c  -1-1 --> -2
c    ( b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧  b^{371, 2}_0 ∧ -p_742) -> ( b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0)
c  in CNF:
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨  b^{371, 3}_2
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨  b^{371, 3}_1
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨  p_742 ∨ -b^{371, 3}_0
c  in DIMACS:
-24368  24369 -24370  742  24371 0
-24368  24369 -24370  742  24372 0
-24368  24369 -24370  742 -24373 0

c  -2-1 --> break 
c    ( b^{371, 2}_2 ∧  b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧ -p_742) -> break
c  in CNF:
c    -b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨  b^{371, 2}_0 ∨  p_742 ∨ break
c  in DIMACS:
-24368 -24369  24370  742 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{371, 2}_2 ∧ -b^{371, 2}_1 ∧ -b^{371, 2}_0 ∧ true) 
c  in CNF:
c    -b^{371, 2}_2 ∨  b^{371, 2}_1 ∨  b^{371, 2}_0 ∨ false 
c  in DIMACS:
-24368  24369  24370  0

c  3 does not represent an automaton state.
c    -(-b^{371, 2}_2 ∧  b^{371, 2}_1 ∧  b^{371, 2}_0 ∧ true) 
c  in CNF:
c     b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ false 
c  in DIMACS:
 24368 -24369 -24370  0
c  -3 does not represent an automaton state.
c    -( b^{371, 2}_2 ∧  b^{371, 2}_1 ∧  b^{371, 2}_0 ∧ true) 
c  in CNF:
c    -b^{371, 2}_2 ∨ -b^{371, 2}_1 ∨ -b^{371, 2}_0 ∨ false 
c  in DIMACS:
-24368 -24369 -24370  0

c i = 3
c  -2+1 --> -1
c    ( b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧  p_1113) -> ( b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧  b^{371, 4}_0)
c  in CNF:
c    -b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨  b^{371, 4}_2
c    -b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_1
c    -b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨  b^{371, 4}_0
c  in DIMACS:
-24371 -24372  24373 -1113  24374 0
-24371 -24372  24373 -1113 -24375 0
-24371 -24372  24373 -1113  24376 0

c  -1+1 --> 0
c    ( b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0 ∧  p_1113) -> (-b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧ -b^{371, 4}_0)
c  in CNF:
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_2
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_1
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_0
c  in DIMACS:
-24371  24372 -24373 -1113 -24374 0
-24371  24372 -24373 -1113 -24375 0
-24371  24372 -24373 -1113 -24376 0

c  0+1 --> 1
c    (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧  p_1113) -> (-b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧  b^{371, 4}_0)
c  in CNF:
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_2
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_1
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨  b^{371, 4}_0
c  in DIMACS:
 24371  24372  24373 -1113 -24374 0
 24371  24372  24373 -1113 -24375 0
 24371  24372  24373 -1113  24376 0

c  1+1 --> 2
c    (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0 ∧  p_1113) -> (-b^{371, 4}_2 ∧  b^{371, 4}_1 ∧ -b^{371, 4}_0)
c  in CNF:
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_2
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨  b^{371, 4}_1
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ -p_1113 ∨ -b^{371, 4}_0
c  in DIMACS:
 24371  24372 -24373 -1113 -24374 0
 24371  24372 -24373 -1113  24375 0
 24371  24372 -24373 -1113 -24376 0

c  2+1 --> break 
c    (-b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧  p_1113) -> break
c  in CNF:
c     b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ -p_1113 ∨ break
c  in DIMACS:
 24371 -24372  24373 -1113 1162 0


c  2-1 --> 1
c    (-b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧ -p_1113) -> (-b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧  b^{371, 4}_0)
c  in CNF:
c     b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_2
c     b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_1
c     b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨  b^{371, 4}_0
c  in DIMACS:
 24371 -24372  24373  1113 -24374 0
 24371 -24372  24373  1113 -24375 0
 24371 -24372  24373  1113  24376 0

c  1-1 --> 0
c    (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0 ∧ -p_1113) -> (-b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧ -b^{371, 4}_0)
c  in CNF:
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_2
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_1
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_0
c  in DIMACS:
 24371  24372 -24373  1113 -24374 0
 24371  24372 -24373  1113 -24375 0
 24371  24372 -24373  1113 -24376 0

c  0-1 --> -1
c    (-b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧ -p_1113) -> ( b^{371, 4}_2 ∧ -b^{371, 4}_1 ∧  b^{371, 4}_0)
c  in CNF:
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨  b^{371, 4}_2
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_1
c     b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨  b^{371, 4}_0
c  in DIMACS:
 24371  24372  24373  1113  24374 0
 24371  24372  24373  1113 -24375 0
 24371  24372  24373  1113  24376 0

c  -1-1 --> -2
c    ( b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧  b^{371, 3}_0 ∧ -p_1113) -> ( b^{371, 4}_2 ∧  b^{371, 4}_1 ∧ -b^{371, 4}_0)
c  in CNF:
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨  b^{371, 4}_2
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨  b^{371, 4}_1
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨  p_1113 ∨ -b^{371, 4}_0
c  in DIMACS:
-24371  24372 -24373  1113  24374 0
-24371  24372 -24373  1113  24375 0
-24371  24372 -24373  1113 -24376 0

c  -2-1 --> break 
c    ( b^{371, 3}_2 ∧  b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧ -p_1113) -> break
c  in CNF:
c    -b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨  b^{371, 3}_0 ∨  p_1113 ∨ break
c  in DIMACS:
-24371 -24372  24373  1113 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{371, 3}_2 ∧ -b^{371, 3}_1 ∧ -b^{371, 3}_0 ∧ true) 
c  in CNF:
c    -b^{371, 3}_2 ∨  b^{371, 3}_1 ∨  b^{371, 3}_0 ∨ false 
c  in DIMACS:
-24371  24372  24373  0

c  3 does not represent an automaton state.
c    -(-b^{371, 3}_2 ∧  b^{371, 3}_1 ∧  b^{371, 3}_0 ∧ true) 
c  in CNF:
c     b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ false 
c  in DIMACS:
 24371 -24372 -24373  0
c  -3 does not represent an automaton state.
c    -( b^{371, 3}_2 ∧  b^{371, 3}_1 ∧  b^{371, 3}_0 ∧ true) 
c  in CNF:
c    -b^{371, 3}_2 ∨ -b^{371, 3}_1 ∨ -b^{371, 3}_0 ∨ false 
c  in DIMACS:
-24371 -24372 -24373  0

c INIT for k = 372
c    -b^{372, 1}_2
c    -b^{372, 1}_1
c    -b^{372, 1}_0
c  in DIMACS:
-24377 0
-24378 0
-24379 0

c Transitions for k = 372
c i = 1
c  -2+1 --> -1
c    ( b^{372, 1}_2 ∧  b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧  p_372) -> ( b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0)
c  in CNF:
c    -b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨  b^{372, 2}_2
c    -b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_1
c    -b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨  b^{372, 2}_0
c  in DIMACS:
-24377 -24378  24379 -372  24380 0
-24377 -24378  24379 -372 -24381 0
-24377 -24378  24379 -372  24382 0

c  -1+1 --> 0
c    ( b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧  b^{372, 1}_0 ∧  p_372) -> (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧ -b^{372, 2}_0)
c  in CNF:
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_2
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_1
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_0
c  in DIMACS:
-24377  24378 -24379 -372 -24380 0
-24377  24378 -24379 -372 -24381 0
-24377  24378 -24379 -372 -24382 0

c  0+1 --> 1
c    (-b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧  p_372) -> (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0)
c  in CNF:
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_2
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_1
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨  b^{372, 2}_0
c  in DIMACS:
 24377  24378  24379 -372 -24380 0
 24377  24378  24379 -372 -24381 0
 24377  24378  24379 -372  24382 0

c  1+1 --> 2
c    (-b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧  b^{372, 1}_0 ∧  p_372) -> (-b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0)
c  in CNF:
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_2
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨  b^{372, 2}_1
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ -p_372 ∨ -b^{372, 2}_0
c  in DIMACS:
 24377  24378 -24379 -372 -24380 0
 24377  24378 -24379 -372  24381 0
 24377  24378 -24379 -372 -24382 0

c  2+1 --> break 
c    (-b^{372, 1}_2 ∧  b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧  p_372) -> break
c  in CNF:
c     b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ -p_372 ∨ break
c  in DIMACS:
 24377 -24378  24379 -372 1162 0


c  2-1 --> 1
c    (-b^{372, 1}_2 ∧  b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧ -p_372) -> (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0)
c  in CNF:
c     b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_2
c     b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_1
c     b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨  b^{372, 2}_0
c  in DIMACS:
 24377 -24378  24379  372 -24380 0
 24377 -24378  24379  372 -24381 0
 24377 -24378  24379  372  24382 0

c  1-1 --> 0
c    (-b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧  b^{372, 1}_0 ∧ -p_372) -> (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧ -b^{372, 2}_0)
c  in CNF:
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_2
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_1
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_0
c  in DIMACS:
 24377  24378 -24379  372 -24380 0
 24377  24378 -24379  372 -24381 0
 24377  24378 -24379  372 -24382 0

c  0-1 --> -1
c    (-b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧ -p_372) -> ( b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0)
c  in CNF:
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨  b^{372, 2}_2
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_1
c     b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨  b^{372, 2}_0
c  in DIMACS:
 24377  24378  24379  372  24380 0
 24377  24378  24379  372 -24381 0
 24377  24378  24379  372  24382 0

c  -1-1 --> -2
c    ( b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧  b^{372, 1}_0 ∧ -p_372) -> ( b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0)
c  in CNF:
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨  b^{372, 2}_2
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨  b^{372, 2}_1
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨  p_372 ∨ -b^{372, 2}_0
c  in DIMACS:
-24377  24378 -24379  372  24380 0
-24377  24378 -24379  372  24381 0
-24377  24378 -24379  372 -24382 0

c  -2-1 --> break 
c    ( b^{372, 1}_2 ∧  b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧ -p_372) -> break
c  in CNF:
c    -b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨  b^{372, 1}_0 ∨  p_372 ∨ break
c  in DIMACS:
-24377 -24378  24379  372 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{372, 1}_2 ∧ -b^{372, 1}_1 ∧ -b^{372, 1}_0 ∧ true) 
c  in CNF:
c    -b^{372, 1}_2 ∨  b^{372, 1}_1 ∨  b^{372, 1}_0 ∨ false 
c  in DIMACS:
-24377  24378  24379  0

c  3 does not represent an automaton state.
c    -(-b^{372, 1}_2 ∧  b^{372, 1}_1 ∧  b^{372, 1}_0 ∧ true) 
c  in CNF:
c     b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ false 
c  in DIMACS:
 24377 -24378 -24379  0
c  -3 does not represent an automaton state.
c    -( b^{372, 1}_2 ∧  b^{372, 1}_1 ∧  b^{372, 1}_0 ∧ true) 
c  in CNF:
c    -b^{372, 1}_2 ∨ -b^{372, 1}_1 ∨ -b^{372, 1}_0 ∨ false 
c  in DIMACS:
-24377 -24378 -24379  0

c i = 2
c  -2+1 --> -1
c    ( b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧  p_744) -> ( b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0)
c  in CNF:
c    -b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨  b^{372, 3}_2
c    -b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_1
c    -b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨  b^{372, 3}_0
c  in DIMACS:
-24380 -24381  24382 -744  24383 0
-24380 -24381  24382 -744 -24384 0
-24380 -24381  24382 -744  24385 0

c  -1+1 --> 0
c    ( b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0 ∧  p_744) -> (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧ -b^{372, 3}_0)
c  in CNF:
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_2
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_1
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_0
c  in DIMACS:
-24380  24381 -24382 -744 -24383 0
-24380  24381 -24382 -744 -24384 0
-24380  24381 -24382 -744 -24385 0

c  0+1 --> 1
c    (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧  p_744) -> (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0)
c  in CNF:
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_2
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_1
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨  b^{372, 3}_0
c  in DIMACS:
 24380  24381  24382 -744 -24383 0
 24380  24381  24382 -744 -24384 0
 24380  24381  24382 -744  24385 0

c  1+1 --> 2
c    (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0 ∧  p_744) -> (-b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0)
c  in CNF:
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_2
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨  b^{372, 3}_1
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ -p_744 ∨ -b^{372, 3}_0
c  in DIMACS:
 24380  24381 -24382 -744 -24383 0
 24380  24381 -24382 -744  24384 0
 24380  24381 -24382 -744 -24385 0

c  2+1 --> break 
c    (-b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧  p_744) -> break
c  in CNF:
c     b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ -p_744 ∨ break
c  in DIMACS:
 24380 -24381  24382 -744 1162 0


c  2-1 --> 1
c    (-b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧ -p_744) -> (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0)
c  in CNF:
c     b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_2
c     b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_1
c     b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨  b^{372, 3}_0
c  in DIMACS:
 24380 -24381  24382  744 -24383 0
 24380 -24381  24382  744 -24384 0
 24380 -24381  24382  744  24385 0

c  1-1 --> 0
c    (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0 ∧ -p_744) -> (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧ -b^{372, 3}_0)
c  in CNF:
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_2
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_1
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_0
c  in DIMACS:
 24380  24381 -24382  744 -24383 0
 24380  24381 -24382  744 -24384 0
 24380  24381 -24382  744 -24385 0

c  0-1 --> -1
c    (-b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧ -p_744) -> ( b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0)
c  in CNF:
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨  b^{372, 3}_2
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_1
c     b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨  b^{372, 3}_0
c  in DIMACS:
 24380  24381  24382  744  24383 0
 24380  24381  24382  744 -24384 0
 24380  24381  24382  744  24385 0

c  -1-1 --> -2
c    ( b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧  b^{372, 2}_0 ∧ -p_744) -> ( b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0)
c  in CNF:
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨  b^{372, 3}_2
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨  b^{372, 3}_1
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨  p_744 ∨ -b^{372, 3}_0
c  in DIMACS:
-24380  24381 -24382  744  24383 0
-24380  24381 -24382  744  24384 0
-24380  24381 -24382  744 -24385 0

c  -2-1 --> break 
c    ( b^{372, 2}_2 ∧  b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧ -p_744) -> break
c  in CNF:
c    -b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨  b^{372, 2}_0 ∨  p_744 ∨ break
c  in DIMACS:
-24380 -24381  24382  744 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{372, 2}_2 ∧ -b^{372, 2}_1 ∧ -b^{372, 2}_0 ∧ true) 
c  in CNF:
c    -b^{372, 2}_2 ∨  b^{372, 2}_1 ∨  b^{372, 2}_0 ∨ false 
c  in DIMACS:
-24380  24381  24382  0

c  3 does not represent an automaton state.
c    -(-b^{372, 2}_2 ∧  b^{372, 2}_1 ∧  b^{372, 2}_0 ∧ true) 
c  in CNF:
c     b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ false 
c  in DIMACS:
 24380 -24381 -24382  0
c  -3 does not represent an automaton state.
c    -( b^{372, 2}_2 ∧  b^{372, 2}_1 ∧  b^{372, 2}_0 ∧ true) 
c  in CNF:
c    -b^{372, 2}_2 ∨ -b^{372, 2}_1 ∨ -b^{372, 2}_0 ∨ false 
c  in DIMACS:
-24380 -24381 -24382  0

c i = 3
c  -2+1 --> -1
c    ( b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧  p_1116) -> ( b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧  b^{372, 4}_0)
c  in CNF:
c    -b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨  b^{372, 4}_2
c    -b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_1
c    -b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨  b^{372, 4}_0
c  in DIMACS:
-24383 -24384  24385 -1116  24386 0
-24383 -24384  24385 -1116 -24387 0
-24383 -24384  24385 -1116  24388 0

c  -1+1 --> 0
c    ( b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0 ∧  p_1116) -> (-b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧ -b^{372, 4}_0)
c  in CNF:
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_2
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_1
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_0
c  in DIMACS:
-24383  24384 -24385 -1116 -24386 0
-24383  24384 -24385 -1116 -24387 0
-24383  24384 -24385 -1116 -24388 0

c  0+1 --> 1
c    (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧  p_1116) -> (-b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧  b^{372, 4}_0)
c  in CNF:
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_2
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_1
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨  b^{372, 4}_0
c  in DIMACS:
 24383  24384  24385 -1116 -24386 0
 24383  24384  24385 -1116 -24387 0
 24383  24384  24385 -1116  24388 0

c  1+1 --> 2
c    (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0 ∧  p_1116) -> (-b^{372, 4}_2 ∧  b^{372, 4}_1 ∧ -b^{372, 4}_0)
c  in CNF:
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_2
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨  b^{372, 4}_1
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ -p_1116 ∨ -b^{372, 4}_0
c  in DIMACS:
 24383  24384 -24385 -1116 -24386 0
 24383  24384 -24385 -1116  24387 0
 24383  24384 -24385 -1116 -24388 0

c  2+1 --> break 
c    (-b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧  p_1116) -> break
c  in CNF:
c     b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ -p_1116 ∨ break
c  in DIMACS:
 24383 -24384  24385 -1116 1162 0


c  2-1 --> 1
c    (-b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧ -p_1116) -> (-b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧  b^{372, 4}_0)
c  in CNF:
c     b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_2
c     b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_1
c     b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨  b^{372, 4}_0
c  in DIMACS:
 24383 -24384  24385  1116 -24386 0
 24383 -24384  24385  1116 -24387 0
 24383 -24384  24385  1116  24388 0

c  1-1 --> 0
c    (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0 ∧ -p_1116) -> (-b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧ -b^{372, 4}_0)
c  in CNF:
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_2
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_1
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_0
c  in DIMACS:
 24383  24384 -24385  1116 -24386 0
 24383  24384 -24385  1116 -24387 0
 24383  24384 -24385  1116 -24388 0

c  0-1 --> -1
c    (-b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧ -p_1116) -> ( b^{372, 4}_2 ∧ -b^{372, 4}_1 ∧  b^{372, 4}_0)
c  in CNF:
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨  b^{372, 4}_2
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_1
c     b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨  b^{372, 4}_0
c  in DIMACS:
 24383  24384  24385  1116  24386 0
 24383  24384  24385  1116 -24387 0
 24383  24384  24385  1116  24388 0

c  -1-1 --> -2
c    ( b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧  b^{372, 3}_0 ∧ -p_1116) -> ( b^{372, 4}_2 ∧  b^{372, 4}_1 ∧ -b^{372, 4}_0)
c  in CNF:
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨  b^{372, 4}_2
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨  b^{372, 4}_1
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨  p_1116 ∨ -b^{372, 4}_0
c  in DIMACS:
-24383  24384 -24385  1116  24386 0
-24383  24384 -24385  1116  24387 0
-24383  24384 -24385  1116 -24388 0

c  -2-1 --> break 
c    ( b^{372, 3}_2 ∧  b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧ -p_1116) -> break
c  in CNF:
c    -b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨  b^{372, 3}_0 ∨  p_1116 ∨ break
c  in DIMACS:
-24383 -24384  24385  1116 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{372, 3}_2 ∧ -b^{372, 3}_1 ∧ -b^{372, 3}_0 ∧ true) 
c  in CNF:
c    -b^{372, 3}_2 ∨  b^{372, 3}_1 ∨  b^{372, 3}_0 ∨ false 
c  in DIMACS:
-24383  24384  24385  0

c  3 does not represent an automaton state.
c    -(-b^{372, 3}_2 ∧  b^{372, 3}_1 ∧  b^{372, 3}_0 ∧ true) 
c  in CNF:
c     b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ false 
c  in DIMACS:
 24383 -24384 -24385  0
c  -3 does not represent an automaton state.
c    -( b^{372, 3}_2 ∧  b^{372, 3}_1 ∧  b^{372, 3}_0 ∧ true) 
c  in CNF:
c    -b^{372, 3}_2 ∨ -b^{372, 3}_1 ∨ -b^{372, 3}_0 ∨ false 
c  in DIMACS:
-24383 -24384 -24385  0

c INIT for k = 373
c    -b^{373, 1}_2
c    -b^{373, 1}_1
c    -b^{373, 1}_0
c  in DIMACS:
-24389 0
-24390 0
-24391 0

c Transitions for k = 373
c i = 1
c  -2+1 --> -1
c    ( b^{373, 1}_2 ∧  b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧  p_373) -> ( b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0)
c  in CNF:
c    -b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨  b^{373, 2}_2
c    -b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_1
c    -b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨  b^{373, 2}_0
c  in DIMACS:
-24389 -24390  24391 -373  24392 0
-24389 -24390  24391 -373 -24393 0
-24389 -24390  24391 -373  24394 0

c  -1+1 --> 0
c    ( b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧  b^{373, 1}_0 ∧  p_373) -> (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧ -b^{373, 2}_0)
c  in CNF:
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_2
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_1
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_0
c  in DIMACS:
-24389  24390 -24391 -373 -24392 0
-24389  24390 -24391 -373 -24393 0
-24389  24390 -24391 -373 -24394 0

c  0+1 --> 1
c    (-b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧  p_373) -> (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0)
c  in CNF:
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_2
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_1
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨  b^{373, 2}_0
c  in DIMACS:
 24389  24390  24391 -373 -24392 0
 24389  24390  24391 -373 -24393 0
 24389  24390  24391 -373  24394 0

c  1+1 --> 2
c    (-b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧  b^{373, 1}_0 ∧  p_373) -> (-b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0)
c  in CNF:
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_2
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨  b^{373, 2}_1
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ -p_373 ∨ -b^{373, 2}_0
c  in DIMACS:
 24389  24390 -24391 -373 -24392 0
 24389  24390 -24391 -373  24393 0
 24389  24390 -24391 -373 -24394 0

c  2+1 --> break 
c    (-b^{373, 1}_2 ∧  b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧  p_373) -> break
c  in CNF:
c     b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ -p_373 ∨ break
c  in DIMACS:
 24389 -24390  24391 -373 1162 0


c  2-1 --> 1
c    (-b^{373, 1}_2 ∧  b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧ -p_373) -> (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0)
c  in CNF:
c     b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_2
c     b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_1
c     b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨  b^{373, 2}_0
c  in DIMACS:
 24389 -24390  24391  373 -24392 0
 24389 -24390  24391  373 -24393 0
 24389 -24390  24391  373  24394 0

c  1-1 --> 0
c    (-b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧  b^{373, 1}_0 ∧ -p_373) -> (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧ -b^{373, 2}_0)
c  in CNF:
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_2
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_1
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_0
c  in DIMACS:
 24389  24390 -24391  373 -24392 0
 24389  24390 -24391  373 -24393 0
 24389  24390 -24391  373 -24394 0

c  0-1 --> -1
c    (-b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧ -p_373) -> ( b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0)
c  in CNF:
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨  b^{373, 2}_2
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_1
c     b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨  b^{373, 2}_0
c  in DIMACS:
 24389  24390  24391  373  24392 0
 24389  24390  24391  373 -24393 0
 24389  24390  24391  373  24394 0

c  -1-1 --> -2
c    ( b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧  b^{373, 1}_0 ∧ -p_373) -> ( b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0)
c  in CNF:
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨  b^{373, 2}_2
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨  b^{373, 2}_1
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨  p_373 ∨ -b^{373, 2}_0
c  in DIMACS:
-24389  24390 -24391  373  24392 0
-24389  24390 -24391  373  24393 0
-24389  24390 -24391  373 -24394 0

c  -2-1 --> break 
c    ( b^{373, 1}_2 ∧  b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧ -p_373) -> break
c  in CNF:
c    -b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨  b^{373, 1}_0 ∨  p_373 ∨ break
c  in DIMACS:
-24389 -24390  24391  373 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{373, 1}_2 ∧ -b^{373, 1}_1 ∧ -b^{373, 1}_0 ∧ true) 
c  in CNF:
c    -b^{373, 1}_2 ∨  b^{373, 1}_1 ∨  b^{373, 1}_0 ∨ false 
c  in DIMACS:
-24389  24390  24391  0

c  3 does not represent an automaton state.
c    -(-b^{373, 1}_2 ∧  b^{373, 1}_1 ∧  b^{373, 1}_0 ∧ true) 
c  in CNF:
c     b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ false 
c  in DIMACS:
 24389 -24390 -24391  0
c  -3 does not represent an automaton state.
c    -( b^{373, 1}_2 ∧  b^{373, 1}_1 ∧  b^{373, 1}_0 ∧ true) 
c  in CNF:
c    -b^{373, 1}_2 ∨ -b^{373, 1}_1 ∨ -b^{373, 1}_0 ∨ false 
c  in DIMACS:
-24389 -24390 -24391  0

c i = 2
c  -2+1 --> -1
c    ( b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧  p_746) -> ( b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0)
c  in CNF:
c    -b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨  b^{373, 3}_2
c    -b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_1
c    -b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨  b^{373, 3}_0
c  in DIMACS:
-24392 -24393  24394 -746  24395 0
-24392 -24393  24394 -746 -24396 0
-24392 -24393  24394 -746  24397 0

c  -1+1 --> 0
c    ( b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0 ∧  p_746) -> (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧ -b^{373, 3}_0)
c  in CNF:
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_2
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_1
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_0
c  in DIMACS:
-24392  24393 -24394 -746 -24395 0
-24392  24393 -24394 -746 -24396 0
-24392  24393 -24394 -746 -24397 0

c  0+1 --> 1
c    (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧  p_746) -> (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0)
c  in CNF:
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_2
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_1
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨  b^{373, 3}_0
c  in DIMACS:
 24392  24393  24394 -746 -24395 0
 24392  24393  24394 -746 -24396 0
 24392  24393  24394 -746  24397 0

c  1+1 --> 2
c    (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0 ∧  p_746) -> (-b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0)
c  in CNF:
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_2
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨  b^{373, 3}_1
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ -p_746 ∨ -b^{373, 3}_0
c  in DIMACS:
 24392  24393 -24394 -746 -24395 0
 24392  24393 -24394 -746  24396 0
 24392  24393 -24394 -746 -24397 0

c  2+1 --> break 
c    (-b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧  p_746) -> break
c  in CNF:
c     b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ -p_746 ∨ break
c  in DIMACS:
 24392 -24393  24394 -746 1162 0


c  2-1 --> 1
c    (-b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧ -p_746) -> (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0)
c  in CNF:
c     b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_2
c     b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_1
c     b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨  b^{373, 3}_0
c  in DIMACS:
 24392 -24393  24394  746 -24395 0
 24392 -24393  24394  746 -24396 0
 24392 -24393  24394  746  24397 0

c  1-1 --> 0
c    (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0 ∧ -p_746) -> (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧ -b^{373, 3}_0)
c  in CNF:
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_2
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_1
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_0
c  in DIMACS:
 24392  24393 -24394  746 -24395 0
 24392  24393 -24394  746 -24396 0
 24392  24393 -24394  746 -24397 0

c  0-1 --> -1
c    (-b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧ -p_746) -> ( b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0)
c  in CNF:
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨  b^{373, 3}_2
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_1
c     b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨  b^{373, 3}_0
c  in DIMACS:
 24392  24393  24394  746  24395 0
 24392  24393  24394  746 -24396 0
 24392  24393  24394  746  24397 0

c  -1-1 --> -2
c    ( b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧  b^{373, 2}_0 ∧ -p_746) -> ( b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0)
c  in CNF:
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨  b^{373, 3}_2
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨  b^{373, 3}_1
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨  p_746 ∨ -b^{373, 3}_0
c  in DIMACS:
-24392  24393 -24394  746  24395 0
-24392  24393 -24394  746  24396 0
-24392  24393 -24394  746 -24397 0

c  -2-1 --> break 
c    ( b^{373, 2}_2 ∧  b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧ -p_746) -> break
c  in CNF:
c    -b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨  b^{373, 2}_0 ∨  p_746 ∨ break
c  in DIMACS:
-24392 -24393  24394  746 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{373, 2}_2 ∧ -b^{373, 2}_1 ∧ -b^{373, 2}_0 ∧ true) 
c  in CNF:
c    -b^{373, 2}_2 ∨  b^{373, 2}_1 ∨  b^{373, 2}_0 ∨ false 
c  in DIMACS:
-24392  24393  24394  0

c  3 does not represent an automaton state.
c    -(-b^{373, 2}_2 ∧  b^{373, 2}_1 ∧  b^{373, 2}_0 ∧ true) 
c  in CNF:
c     b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ false 
c  in DIMACS:
 24392 -24393 -24394  0
c  -3 does not represent an automaton state.
c    -( b^{373, 2}_2 ∧  b^{373, 2}_1 ∧  b^{373, 2}_0 ∧ true) 
c  in CNF:
c    -b^{373, 2}_2 ∨ -b^{373, 2}_1 ∨ -b^{373, 2}_0 ∨ false 
c  in DIMACS:
-24392 -24393 -24394  0

c i = 3
c  -2+1 --> -1
c    ( b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧  p_1119) -> ( b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧  b^{373, 4}_0)
c  in CNF:
c    -b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨  b^{373, 4}_2
c    -b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_1
c    -b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨  b^{373, 4}_0
c  in DIMACS:
-24395 -24396  24397 -1119  24398 0
-24395 -24396  24397 -1119 -24399 0
-24395 -24396  24397 -1119  24400 0

c  -1+1 --> 0
c    ( b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0 ∧  p_1119) -> (-b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧ -b^{373, 4}_0)
c  in CNF:
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_2
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_1
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_0
c  in DIMACS:
-24395  24396 -24397 -1119 -24398 0
-24395  24396 -24397 -1119 -24399 0
-24395  24396 -24397 -1119 -24400 0

c  0+1 --> 1
c    (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧  p_1119) -> (-b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧  b^{373, 4}_0)
c  in CNF:
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_2
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_1
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨  b^{373, 4}_0
c  in DIMACS:
 24395  24396  24397 -1119 -24398 0
 24395  24396  24397 -1119 -24399 0
 24395  24396  24397 -1119  24400 0

c  1+1 --> 2
c    (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0 ∧  p_1119) -> (-b^{373, 4}_2 ∧  b^{373, 4}_1 ∧ -b^{373, 4}_0)
c  in CNF:
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_2
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨  b^{373, 4}_1
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ -p_1119 ∨ -b^{373, 4}_0
c  in DIMACS:
 24395  24396 -24397 -1119 -24398 0
 24395  24396 -24397 -1119  24399 0
 24395  24396 -24397 -1119 -24400 0

c  2+1 --> break 
c    (-b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧  p_1119) -> break
c  in CNF:
c     b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ -p_1119 ∨ break
c  in DIMACS:
 24395 -24396  24397 -1119 1162 0


c  2-1 --> 1
c    (-b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧ -p_1119) -> (-b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧  b^{373, 4}_0)
c  in CNF:
c     b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_2
c     b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_1
c     b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨  b^{373, 4}_0
c  in DIMACS:
 24395 -24396  24397  1119 -24398 0
 24395 -24396  24397  1119 -24399 0
 24395 -24396  24397  1119  24400 0

c  1-1 --> 0
c    (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0 ∧ -p_1119) -> (-b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧ -b^{373, 4}_0)
c  in CNF:
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_2
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_1
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_0
c  in DIMACS:
 24395  24396 -24397  1119 -24398 0
 24395  24396 -24397  1119 -24399 0
 24395  24396 -24397  1119 -24400 0

c  0-1 --> -1
c    (-b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧ -p_1119) -> ( b^{373, 4}_2 ∧ -b^{373, 4}_1 ∧  b^{373, 4}_0)
c  in CNF:
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨  b^{373, 4}_2
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_1
c     b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨  b^{373, 4}_0
c  in DIMACS:
 24395  24396  24397  1119  24398 0
 24395  24396  24397  1119 -24399 0
 24395  24396  24397  1119  24400 0

c  -1-1 --> -2
c    ( b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧  b^{373, 3}_0 ∧ -p_1119) -> ( b^{373, 4}_2 ∧  b^{373, 4}_1 ∧ -b^{373, 4}_0)
c  in CNF:
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨  b^{373, 4}_2
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨  b^{373, 4}_1
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨  p_1119 ∨ -b^{373, 4}_0
c  in DIMACS:
-24395  24396 -24397  1119  24398 0
-24395  24396 -24397  1119  24399 0
-24395  24396 -24397  1119 -24400 0

c  -2-1 --> break 
c    ( b^{373, 3}_2 ∧  b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧ -p_1119) -> break
c  in CNF:
c    -b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨  b^{373, 3}_0 ∨  p_1119 ∨ break
c  in DIMACS:
-24395 -24396  24397  1119 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{373, 3}_2 ∧ -b^{373, 3}_1 ∧ -b^{373, 3}_0 ∧ true) 
c  in CNF:
c    -b^{373, 3}_2 ∨  b^{373, 3}_1 ∨  b^{373, 3}_0 ∨ false 
c  in DIMACS:
-24395  24396  24397  0

c  3 does not represent an automaton state.
c    -(-b^{373, 3}_2 ∧  b^{373, 3}_1 ∧  b^{373, 3}_0 ∧ true) 
c  in CNF:
c     b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ false 
c  in DIMACS:
 24395 -24396 -24397  0
c  -3 does not represent an automaton state.
c    -( b^{373, 3}_2 ∧  b^{373, 3}_1 ∧  b^{373, 3}_0 ∧ true) 
c  in CNF:
c    -b^{373, 3}_2 ∨ -b^{373, 3}_1 ∨ -b^{373, 3}_0 ∨ false 
c  in DIMACS:
-24395 -24396 -24397  0

c INIT for k = 374
c    -b^{374, 1}_2
c    -b^{374, 1}_1
c    -b^{374, 1}_0
c  in DIMACS:
-24401 0
-24402 0
-24403 0

c Transitions for k = 374
c i = 1
c  -2+1 --> -1
c    ( b^{374, 1}_2 ∧  b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧  p_374) -> ( b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0)
c  in CNF:
c    -b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨  b^{374, 2}_2
c    -b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_1
c    -b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨  b^{374, 2}_0
c  in DIMACS:
-24401 -24402  24403 -374  24404 0
-24401 -24402  24403 -374 -24405 0
-24401 -24402  24403 -374  24406 0

c  -1+1 --> 0
c    ( b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧  b^{374, 1}_0 ∧  p_374) -> (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧ -b^{374, 2}_0)
c  in CNF:
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_2
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_1
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_0
c  in DIMACS:
-24401  24402 -24403 -374 -24404 0
-24401  24402 -24403 -374 -24405 0
-24401  24402 -24403 -374 -24406 0

c  0+1 --> 1
c    (-b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧  p_374) -> (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0)
c  in CNF:
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_2
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_1
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨  b^{374, 2}_0
c  in DIMACS:
 24401  24402  24403 -374 -24404 0
 24401  24402  24403 -374 -24405 0
 24401  24402  24403 -374  24406 0

c  1+1 --> 2
c    (-b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧  b^{374, 1}_0 ∧  p_374) -> (-b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0)
c  in CNF:
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_2
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨  b^{374, 2}_1
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ -p_374 ∨ -b^{374, 2}_0
c  in DIMACS:
 24401  24402 -24403 -374 -24404 0
 24401  24402 -24403 -374  24405 0
 24401  24402 -24403 -374 -24406 0

c  2+1 --> break 
c    (-b^{374, 1}_2 ∧  b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧  p_374) -> break
c  in CNF:
c     b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ -p_374 ∨ break
c  in DIMACS:
 24401 -24402  24403 -374 1162 0


c  2-1 --> 1
c    (-b^{374, 1}_2 ∧  b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧ -p_374) -> (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0)
c  in CNF:
c     b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_2
c     b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_1
c     b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨  b^{374, 2}_0
c  in DIMACS:
 24401 -24402  24403  374 -24404 0
 24401 -24402  24403  374 -24405 0
 24401 -24402  24403  374  24406 0

c  1-1 --> 0
c    (-b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧  b^{374, 1}_0 ∧ -p_374) -> (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧ -b^{374, 2}_0)
c  in CNF:
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_2
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_1
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_0
c  in DIMACS:
 24401  24402 -24403  374 -24404 0
 24401  24402 -24403  374 -24405 0
 24401  24402 -24403  374 -24406 0

c  0-1 --> -1
c    (-b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧ -p_374) -> ( b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0)
c  in CNF:
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨  b^{374, 2}_2
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_1
c     b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨  b^{374, 2}_0
c  in DIMACS:
 24401  24402  24403  374  24404 0
 24401  24402  24403  374 -24405 0
 24401  24402  24403  374  24406 0

c  -1-1 --> -2
c    ( b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧  b^{374, 1}_0 ∧ -p_374) -> ( b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0)
c  in CNF:
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨  b^{374, 2}_2
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨  b^{374, 2}_1
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨  p_374 ∨ -b^{374, 2}_0
c  in DIMACS:
-24401  24402 -24403  374  24404 0
-24401  24402 -24403  374  24405 0
-24401  24402 -24403  374 -24406 0

c  -2-1 --> break 
c    ( b^{374, 1}_2 ∧  b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧ -p_374) -> break
c  in CNF:
c    -b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨  b^{374, 1}_0 ∨  p_374 ∨ break
c  in DIMACS:
-24401 -24402  24403  374 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{374, 1}_2 ∧ -b^{374, 1}_1 ∧ -b^{374, 1}_0 ∧ true) 
c  in CNF:
c    -b^{374, 1}_2 ∨  b^{374, 1}_1 ∨  b^{374, 1}_0 ∨ false 
c  in DIMACS:
-24401  24402  24403  0

c  3 does not represent an automaton state.
c    -(-b^{374, 1}_2 ∧  b^{374, 1}_1 ∧  b^{374, 1}_0 ∧ true) 
c  in CNF:
c     b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ false 
c  in DIMACS:
 24401 -24402 -24403  0
c  -3 does not represent an automaton state.
c    -( b^{374, 1}_2 ∧  b^{374, 1}_1 ∧  b^{374, 1}_0 ∧ true) 
c  in CNF:
c    -b^{374, 1}_2 ∨ -b^{374, 1}_1 ∨ -b^{374, 1}_0 ∨ false 
c  in DIMACS:
-24401 -24402 -24403  0

c i = 2
c  -2+1 --> -1
c    ( b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧  p_748) -> ( b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0)
c  in CNF:
c    -b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨  b^{374, 3}_2
c    -b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_1
c    -b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨  b^{374, 3}_0
c  in DIMACS:
-24404 -24405  24406 -748  24407 0
-24404 -24405  24406 -748 -24408 0
-24404 -24405  24406 -748  24409 0

c  -1+1 --> 0
c    ( b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0 ∧  p_748) -> (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧ -b^{374, 3}_0)
c  in CNF:
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_2
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_1
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_0
c  in DIMACS:
-24404  24405 -24406 -748 -24407 0
-24404  24405 -24406 -748 -24408 0
-24404  24405 -24406 -748 -24409 0

c  0+1 --> 1
c    (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧  p_748) -> (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0)
c  in CNF:
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_2
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_1
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨  b^{374, 3}_0
c  in DIMACS:
 24404  24405  24406 -748 -24407 0
 24404  24405  24406 -748 -24408 0
 24404  24405  24406 -748  24409 0

c  1+1 --> 2
c    (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0 ∧  p_748) -> (-b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0)
c  in CNF:
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_2
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨  b^{374, 3}_1
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ -p_748 ∨ -b^{374, 3}_0
c  in DIMACS:
 24404  24405 -24406 -748 -24407 0
 24404  24405 -24406 -748  24408 0
 24404  24405 -24406 -748 -24409 0

c  2+1 --> break 
c    (-b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧  p_748) -> break
c  in CNF:
c     b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ -p_748 ∨ break
c  in DIMACS:
 24404 -24405  24406 -748 1162 0


c  2-1 --> 1
c    (-b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧ -p_748) -> (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0)
c  in CNF:
c     b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_2
c     b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_1
c     b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨  b^{374, 3}_0
c  in DIMACS:
 24404 -24405  24406  748 -24407 0
 24404 -24405  24406  748 -24408 0
 24404 -24405  24406  748  24409 0

c  1-1 --> 0
c    (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0 ∧ -p_748) -> (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧ -b^{374, 3}_0)
c  in CNF:
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_2
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_1
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_0
c  in DIMACS:
 24404  24405 -24406  748 -24407 0
 24404  24405 -24406  748 -24408 0
 24404  24405 -24406  748 -24409 0

c  0-1 --> -1
c    (-b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧ -p_748) -> ( b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0)
c  in CNF:
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨  b^{374, 3}_2
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_1
c     b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨  b^{374, 3}_0
c  in DIMACS:
 24404  24405  24406  748  24407 0
 24404  24405  24406  748 -24408 0
 24404  24405  24406  748  24409 0

c  -1-1 --> -2
c    ( b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧  b^{374, 2}_0 ∧ -p_748) -> ( b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0)
c  in CNF:
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨  b^{374, 3}_2
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨  b^{374, 3}_1
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨  p_748 ∨ -b^{374, 3}_0
c  in DIMACS:
-24404  24405 -24406  748  24407 0
-24404  24405 -24406  748  24408 0
-24404  24405 -24406  748 -24409 0

c  -2-1 --> break 
c    ( b^{374, 2}_2 ∧  b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧ -p_748) -> break
c  in CNF:
c    -b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨  b^{374, 2}_0 ∨  p_748 ∨ break
c  in DIMACS:
-24404 -24405  24406  748 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{374, 2}_2 ∧ -b^{374, 2}_1 ∧ -b^{374, 2}_0 ∧ true) 
c  in CNF:
c    -b^{374, 2}_2 ∨  b^{374, 2}_1 ∨  b^{374, 2}_0 ∨ false 
c  in DIMACS:
-24404  24405  24406  0

c  3 does not represent an automaton state.
c    -(-b^{374, 2}_2 ∧  b^{374, 2}_1 ∧  b^{374, 2}_0 ∧ true) 
c  in CNF:
c     b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ false 
c  in DIMACS:
 24404 -24405 -24406  0
c  -3 does not represent an automaton state.
c    -( b^{374, 2}_2 ∧  b^{374, 2}_1 ∧  b^{374, 2}_0 ∧ true) 
c  in CNF:
c    -b^{374, 2}_2 ∨ -b^{374, 2}_1 ∨ -b^{374, 2}_0 ∨ false 
c  in DIMACS:
-24404 -24405 -24406  0

c i = 3
c  -2+1 --> -1
c    ( b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧  p_1122) -> ( b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧  b^{374, 4}_0)
c  in CNF:
c    -b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨  b^{374, 4}_2
c    -b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_1
c    -b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨  b^{374, 4}_0
c  in DIMACS:
-24407 -24408  24409 -1122  24410 0
-24407 -24408  24409 -1122 -24411 0
-24407 -24408  24409 -1122  24412 0

c  -1+1 --> 0
c    ( b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0 ∧  p_1122) -> (-b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧ -b^{374, 4}_0)
c  in CNF:
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_2
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_1
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_0
c  in DIMACS:
-24407  24408 -24409 -1122 -24410 0
-24407  24408 -24409 -1122 -24411 0
-24407  24408 -24409 -1122 -24412 0

c  0+1 --> 1
c    (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧  p_1122) -> (-b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧  b^{374, 4}_0)
c  in CNF:
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_2
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_1
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨  b^{374, 4}_0
c  in DIMACS:
 24407  24408  24409 -1122 -24410 0
 24407  24408  24409 -1122 -24411 0
 24407  24408  24409 -1122  24412 0

c  1+1 --> 2
c    (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0 ∧  p_1122) -> (-b^{374, 4}_2 ∧  b^{374, 4}_1 ∧ -b^{374, 4}_0)
c  in CNF:
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_2
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨  b^{374, 4}_1
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ -p_1122 ∨ -b^{374, 4}_0
c  in DIMACS:
 24407  24408 -24409 -1122 -24410 0
 24407  24408 -24409 -1122  24411 0
 24407  24408 -24409 -1122 -24412 0

c  2+1 --> break 
c    (-b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧  p_1122) -> break
c  in CNF:
c     b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ -p_1122 ∨ break
c  in DIMACS:
 24407 -24408  24409 -1122 1162 0


c  2-1 --> 1
c    (-b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧ -p_1122) -> (-b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧  b^{374, 4}_0)
c  in CNF:
c     b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_2
c     b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_1
c     b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨  b^{374, 4}_0
c  in DIMACS:
 24407 -24408  24409  1122 -24410 0
 24407 -24408  24409  1122 -24411 0
 24407 -24408  24409  1122  24412 0

c  1-1 --> 0
c    (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0 ∧ -p_1122) -> (-b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧ -b^{374, 4}_0)
c  in CNF:
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_2
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_1
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_0
c  in DIMACS:
 24407  24408 -24409  1122 -24410 0
 24407  24408 -24409  1122 -24411 0
 24407  24408 -24409  1122 -24412 0

c  0-1 --> -1
c    (-b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧ -p_1122) -> ( b^{374, 4}_2 ∧ -b^{374, 4}_1 ∧  b^{374, 4}_0)
c  in CNF:
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨  b^{374, 4}_2
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_1
c     b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨  b^{374, 4}_0
c  in DIMACS:
 24407  24408  24409  1122  24410 0
 24407  24408  24409  1122 -24411 0
 24407  24408  24409  1122  24412 0

c  -1-1 --> -2
c    ( b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧  b^{374, 3}_0 ∧ -p_1122) -> ( b^{374, 4}_2 ∧  b^{374, 4}_1 ∧ -b^{374, 4}_0)
c  in CNF:
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨  b^{374, 4}_2
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨  b^{374, 4}_1
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨  p_1122 ∨ -b^{374, 4}_0
c  in DIMACS:
-24407  24408 -24409  1122  24410 0
-24407  24408 -24409  1122  24411 0
-24407  24408 -24409  1122 -24412 0

c  -2-1 --> break 
c    ( b^{374, 3}_2 ∧  b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧ -p_1122) -> break
c  in CNF:
c    -b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨  b^{374, 3}_0 ∨  p_1122 ∨ break
c  in DIMACS:
-24407 -24408  24409  1122 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{374, 3}_2 ∧ -b^{374, 3}_1 ∧ -b^{374, 3}_0 ∧ true) 
c  in CNF:
c    -b^{374, 3}_2 ∨  b^{374, 3}_1 ∨  b^{374, 3}_0 ∨ false 
c  in DIMACS:
-24407  24408  24409  0

c  3 does not represent an automaton state.
c    -(-b^{374, 3}_2 ∧  b^{374, 3}_1 ∧  b^{374, 3}_0 ∧ true) 
c  in CNF:
c     b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ false 
c  in DIMACS:
 24407 -24408 -24409  0
c  -3 does not represent an automaton state.
c    -( b^{374, 3}_2 ∧  b^{374, 3}_1 ∧  b^{374, 3}_0 ∧ true) 
c  in CNF:
c    -b^{374, 3}_2 ∨ -b^{374, 3}_1 ∨ -b^{374, 3}_0 ∨ false 
c  in DIMACS:
-24407 -24408 -24409  0

c INIT for k = 375
c    -b^{375, 1}_2
c    -b^{375, 1}_1
c    -b^{375, 1}_0
c  in DIMACS:
-24413 0
-24414 0
-24415 0

c Transitions for k = 375
c i = 1
c  -2+1 --> -1
c    ( b^{375, 1}_2 ∧  b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧  p_375) -> ( b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0)
c  in CNF:
c    -b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨  b^{375, 2}_2
c    -b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_1
c    -b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨  b^{375, 2}_0
c  in DIMACS:
-24413 -24414  24415 -375  24416 0
-24413 -24414  24415 -375 -24417 0
-24413 -24414  24415 -375  24418 0

c  -1+1 --> 0
c    ( b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧  b^{375, 1}_0 ∧  p_375) -> (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧ -b^{375, 2}_0)
c  in CNF:
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_2
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_1
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_0
c  in DIMACS:
-24413  24414 -24415 -375 -24416 0
-24413  24414 -24415 -375 -24417 0
-24413  24414 -24415 -375 -24418 0

c  0+1 --> 1
c    (-b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧  p_375) -> (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0)
c  in CNF:
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_2
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_1
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨  b^{375, 2}_0
c  in DIMACS:
 24413  24414  24415 -375 -24416 0
 24413  24414  24415 -375 -24417 0
 24413  24414  24415 -375  24418 0

c  1+1 --> 2
c    (-b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧  b^{375, 1}_0 ∧  p_375) -> (-b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0)
c  in CNF:
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_2
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨  b^{375, 2}_1
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ -p_375 ∨ -b^{375, 2}_0
c  in DIMACS:
 24413  24414 -24415 -375 -24416 0
 24413  24414 -24415 -375  24417 0
 24413  24414 -24415 -375 -24418 0

c  2+1 --> break 
c    (-b^{375, 1}_2 ∧  b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧  p_375) -> break
c  in CNF:
c     b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ -p_375 ∨ break
c  in DIMACS:
 24413 -24414  24415 -375 1162 0


c  2-1 --> 1
c    (-b^{375, 1}_2 ∧  b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧ -p_375) -> (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0)
c  in CNF:
c     b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_2
c     b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_1
c     b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨  b^{375, 2}_0
c  in DIMACS:
 24413 -24414  24415  375 -24416 0
 24413 -24414  24415  375 -24417 0
 24413 -24414  24415  375  24418 0

c  1-1 --> 0
c    (-b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧  b^{375, 1}_0 ∧ -p_375) -> (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧ -b^{375, 2}_0)
c  in CNF:
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_2
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_1
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_0
c  in DIMACS:
 24413  24414 -24415  375 -24416 0
 24413  24414 -24415  375 -24417 0
 24413  24414 -24415  375 -24418 0

c  0-1 --> -1
c    (-b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧ -p_375) -> ( b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0)
c  in CNF:
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨  b^{375, 2}_2
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_1
c     b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨  b^{375, 2}_0
c  in DIMACS:
 24413  24414  24415  375  24416 0
 24413  24414  24415  375 -24417 0
 24413  24414  24415  375  24418 0

c  -1-1 --> -2
c    ( b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧  b^{375, 1}_0 ∧ -p_375) -> ( b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0)
c  in CNF:
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨  b^{375, 2}_2
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨  b^{375, 2}_1
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨  p_375 ∨ -b^{375, 2}_0
c  in DIMACS:
-24413  24414 -24415  375  24416 0
-24413  24414 -24415  375  24417 0
-24413  24414 -24415  375 -24418 0

c  -2-1 --> break 
c    ( b^{375, 1}_2 ∧  b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧ -p_375) -> break
c  in CNF:
c    -b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨  b^{375, 1}_0 ∨  p_375 ∨ break
c  in DIMACS:
-24413 -24414  24415  375 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{375, 1}_2 ∧ -b^{375, 1}_1 ∧ -b^{375, 1}_0 ∧ true) 
c  in CNF:
c    -b^{375, 1}_2 ∨  b^{375, 1}_1 ∨  b^{375, 1}_0 ∨ false 
c  in DIMACS:
-24413  24414  24415  0

c  3 does not represent an automaton state.
c    -(-b^{375, 1}_2 ∧  b^{375, 1}_1 ∧  b^{375, 1}_0 ∧ true) 
c  in CNF:
c     b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ false 
c  in DIMACS:
 24413 -24414 -24415  0
c  -3 does not represent an automaton state.
c    -( b^{375, 1}_2 ∧  b^{375, 1}_1 ∧  b^{375, 1}_0 ∧ true) 
c  in CNF:
c    -b^{375, 1}_2 ∨ -b^{375, 1}_1 ∨ -b^{375, 1}_0 ∨ false 
c  in DIMACS:
-24413 -24414 -24415  0

c i = 2
c  -2+1 --> -1
c    ( b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧  p_750) -> ( b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0)
c  in CNF:
c    -b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨  b^{375, 3}_2
c    -b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_1
c    -b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨  b^{375, 3}_0
c  in DIMACS:
-24416 -24417  24418 -750  24419 0
-24416 -24417  24418 -750 -24420 0
-24416 -24417  24418 -750  24421 0

c  -1+1 --> 0
c    ( b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0 ∧  p_750) -> (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧ -b^{375, 3}_0)
c  in CNF:
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_2
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_1
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_0
c  in DIMACS:
-24416  24417 -24418 -750 -24419 0
-24416  24417 -24418 -750 -24420 0
-24416  24417 -24418 -750 -24421 0

c  0+1 --> 1
c    (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧  p_750) -> (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0)
c  in CNF:
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_2
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_1
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨  b^{375, 3}_0
c  in DIMACS:
 24416  24417  24418 -750 -24419 0
 24416  24417  24418 -750 -24420 0
 24416  24417  24418 -750  24421 0

c  1+1 --> 2
c    (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0 ∧  p_750) -> (-b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0)
c  in CNF:
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_2
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨  b^{375, 3}_1
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ -p_750 ∨ -b^{375, 3}_0
c  in DIMACS:
 24416  24417 -24418 -750 -24419 0
 24416  24417 -24418 -750  24420 0
 24416  24417 -24418 -750 -24421 0

c  2+1 --> break 
c    (-b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧  p_750) -> break
c  in CNF:
c     b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ -p_750 ∨ break
c  in DIMACS:
 24416 -24417  24418 -750 1162 0


c  2-1 --> 1
c    (-b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧ -p_750) -> (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0)
c  in CNF:
c     b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_2
c     b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_1
c     b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨  b^{375, 3}_0
c  in DIMACS:
 24416 -24417  24418  750 -24419 0
 24416 -24417  24418  750 -24420 0
 24416 -24417  24418  750  24421 0

c  1-1 --> 0
c    (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0 ∧ -p_750) -> (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧ -b^{375, 3}_0)
c  in CNF:
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_2
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_1
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_0
c  in DIMACS:
 24416  24417 -24418  750 -24419 0
 24416  24417 -24418  750 -24420 0
 24416  24417 -24418  750 -24421 0

c  0-1 --> -1
c    (-b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧ -p_750) -> ( b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0)
c  in CNF:
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨  b^{375, 3}_2
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_1
c     b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨  b^{375, 3}_0
c  in DIMACS:
 24416  24417  24418  750  24419 0
 24416  24417  24418  750 -24420 0
 24416  24417  24418  750  24421 0

c  -1-1 --> -2
c    ( b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧  b^{375, 2}_0 ∧ -p_750) -> ( b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0)
c  in CNF:
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨  b^{375, 3}_2
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨  b^{375, 3}_1
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨  p_750 ∨ -b^{375, 3}_0
c  in DIMACS:
-24416  24417 -24418  750  24419 0
-24416  24417 -24418  750  24420 0
-24416  24417 -24418  750 -24421 0

c  -2-1 --> break 
c    ( b^{375, 2}_2 ∧  b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧ -p_750) -> break
c  in CNF:
c    -b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨  b^{375, 2}_0 ∨  p_750 ∨ break
c  in DIMACS:
-24416 -24417  24418  750 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{375, 2}_2 ∧ -b^{375, 2}_1 ∧ -b^{375, 2}_0 ∧ true) 
c  in CNF:
c    -b^{375, 2}_2 ∨  b^{375, 2}_1 ∨  b^{375, 2}_0 ∨ false 
c  in DIMACS:
-24416  24417  24418  0

c  3 does not represent an automaton state.
c    -(-b^{375, 2}_2 ∧  b^{375, 2}_1 ∧  b^{375, 2}_0 ∧ true) 
c  in CNF:
c     b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ false 
c  in DIMACS:
 24416 -24417 -24418  0
c  -3 does not represent an automaton state.
c    -( b^{375, 2}_2 ∧  b^{375, 2}_1 ∧  b^{375, 2}_0 ∧ true) 
c  in CNF:
c    -b^{375, 2}_2 ∨ -b^{375, 2}_1 ∨ -b^{375, 2}_0 ∨ false 
c  in DIMACS:
-24416 -24417 -24418  0

c i = 3
c  -2+1 --> -1
c    ( b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧  p_1125) -> ( b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧  b^{375, 4}_0)
c  in CNF:
c    -b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨  b^{375, 4}_2
c    -b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_1
c    -b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨  b^{375, 4}_0
c  in DIMACS:
-24419 -24420  24421 -1125  24422 0
-24419 -24420  24421 -1125 -24423 0
-24419 -24420  24421 -1125  24424 0

c  -1+1 --> 0
c    ( b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0 ∧  p_1125) -> (-b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧ -b^{375, 4}_0)
c  in CNF:
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_2
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_1
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_0
c  in DIMACS:
-24419  24420 -24421 -1125 -24422 0
-24419  24420 -24421 -1125 -24423 0
-24419  24420 -24421 -1125 -24424 0

c  0+1 --> 1
c    (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧  p_1125) -> (-b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧  b^{375, 4}_0)
c  in CNF:
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_2
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_1
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨  b^{375, 4}_0
c  in DIMACS:
 24419  24420  24421 -1125 -24422 0
 24419  24420  24421 -1125 -24423 0
 24419  24420  24421 -1125  24424 0

c  1+1 --> 2
c    (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0 ∧  p_1125) -> (-b^{375, 4}_2 ∧  b^{375, 4}_1 ∧ -b^{375, 4}_0)
c  in CNF:
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_2
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨  b^{375, 4}_1
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ -p_1125 ∨ -b^{375, 4}_0
c  in DIMACS:
 24419  24420 -24421 -1125 -24422 0
 24419  24420 -24421 -1125  24423 0
 24419  24420 -24421 -1125 -24424 0

c  2+1 --> break 
c    (-b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧  p_1125) -> break
c  in CNF:
c     b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ -p_1125 ∨ break
c  in DIMACS:
 24419 -24420  24421 -1125 1162 0


c  2-1 --> 1
c    (-b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧ -p_1125) -> (-b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧  b^{375, 4}_0)
c  in CNF:
c     b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_2
c     b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_1
c     b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨  b^{375, 4}_0
c  in DIMACS:
 24419 -24420  24421  1125 -24422 0
 24419 -24420  24421  1125 -24423 0
 24419 -24420  24421  1125  24424 0

c  1-1 --> 0
c    (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0 ∧ -p_1125) -> (-b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧ -b^{375, 4}_0)
c  in CNF:
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_2
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_1
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_0
c  in DIMACS:
 24419  24420 -24421  1125 -24422 0
 24419  24420 -24421  1125 -24423 0
 24419  24420 -24421  1125 -24424 0

c  0-1 --> -1
c    (-b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧ -p_1125) -> ( b^{375, 4}_2 ∧ -b^{375, 4}_1 ∧  b^{375, 4}_0)
c  in CNF:
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨  b^{375, 4}_2
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_1
c     b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨  b^{375, 4}_0
c  in DIMACS:
 24419  24420  24421  1125  24422 0
 24419  24420  24421  1125 -24423 0
 24419  24420  24421  1125  24424 0

c  -1-1 --> -2
c    ( b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧  b^{375, 3}_0 ∧ -p_1125) -> ( b^{375, 4}_2 ∧  b^{375, 4}_1 ∧ -b^{375, 4}_0)
c  in CNF:
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨  b^{375, 4}_2
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨  b^{375, 4}_1
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨  p_1125 ∨ -b^{375, 4}_0
c  in DIMACS:
-24419  24420 -24421  1125  24422 0
-24419  24420 -24421  1125  24423 0
-24419  24420 -24421  1125 -24424 0

c  -2-1 --> break 
c    ( b^{375, 3}_2 ∧  b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧ -p_1125) -> break
c  in CNF:
c    -b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨  b^{375, 3}_0 ∨  p_1125 ∨ break
c  in DIMACS:
-24419 -24420  24421  1125 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{375, 3}_2 ∧ -b^{375, 3}_1 ∧ -b^{375, 3}_0 ∧ true) 
c  in CNF:
c    -b^{375, 3}_2 ∨  b^{375, 3}_1 ∨  b^{375, 3}_0 ∨ false 
c  in DIMACS:
-24419  24420  24421  0

c  3 does not represent an automaton state.
c    -(-b^{375, 3}_2 ∧  b^{375, 3}_1 ∧  b^{375, 3}_0 ∧ true) 
c  in CNF:
c     b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ false 
c  in DIMACS:
 24419 -24420 -24421  0
c  -3 does not represent an automaton state.
c    -( b^{375, 3}_2 ∧  b^{375, 3}_1 ∧  b^{375, 3}_0 ∧ true) 
c  in CNF:
c    -b^{375, 3}_2 ∨ -b^{375, 3}_1 ∨ -b^{375, 3}_0 ∨ false 
c  in DIMACS:
-24419 -24420 -24421  0

c INIT for k = 376
c    -b^{376, 1}_2
c    -b^{376, 1}_1
c    -b^{376, 1}_0
c  in DIMACS:
-24425 0
-24426 0
-24427 0

c Transitions for k = 376
c i = 1
c  -2+1 --> -1
c    ( b^{376, 1}_2 ∧  b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧  p_376) -> ( b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0)
c  in CNF:
c    -b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨  b^{376, 2}_2
c    -b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_1
c    -b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨  b^{376, 2}_0
c  in DIMACS:
-24425 -24426  24427 -376  24428 0
-24425 -24426  24427 -376 -24429 0
-24425 -24426  24427 -376  24430 0

c  -1+1 --> 0
c    ( b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧  b^{376, 1}_0 ∧  p_376) -> (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧ -b^{376, 2}_0)
c  in CNF:
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_2
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_1
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_0
c  in DIMACS:
-24425  24426 -24427 -376 -24428 0
-24425  24426 -24427 -376 -24429 0
-24425  24426 -24427 -376 -24430 0

c  0+1 --> 1
c    (-b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧  p_376) -> (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0)
c  in CNF:
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_2
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_1
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨  b^{376, 2}_0
c  in DIMACS:
 24425  24426  24427 -376 -24428 0
 24425  24426  24427 -376 -24429 0
 24425  24426  24427 -376  24430 0

c  1+1 --> 2
c    (-b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧  b^{376, 1}_0 ∧  p_376) -> (-b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0)
c  in CNF:
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_2
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨  b^{376, 2}_1
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ -p_376 ∨ -b^{376, 2}_0
c  in DIMACS:
 24425  24426 -24427 -376 -24428 0
 24425  24426 -24427 -376  24429 0
 24425  24426 -24427 -376 -24430 0

c  2+1 --> break 
c    (-b^{376, 1}_2 ∧  b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧  p_376) -> break
c  in CNF:
c     b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ -p_376 ∨ break
c  in DIMACS:
 24425 -24426  24427 -376 1162 0


c  2-1 --> 1
c    (-b^{376, 1}_2 ∧  b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧ -p_376) -> (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0)
c  in CNF:
c     b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_2
c     b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_1
c     b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨  b^{376, 2}_0
c  in DIMACS:
 24425 -24426  24427  376 -24428 0
 24425 -24426  24427  376 -24429 0
 24425 -24426  24427  376  24430 0

c  1-1 --> 0
c    (-b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧  b^{376, 1}_0 ∧ -p_376) -> (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧ -b^{376, 2}_0)
c  in CNF:
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_2
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_1
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_0
c  in DIMACS:
 24425  24426 -24427  376 -24428 0
 24425  24426 -24427  376 -24429 0
 24425  24426 -24427  376 -24430 0

c  0-1 --> -1
c    (-b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧ -p_376) -> ( b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0)
c  in CNF:
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨  b^{376, 2}_2
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_1
c     b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨  b^{376, 2}_0
c  in DIMACS:
 24425  24426  24427  376  24428 0
 24425  24426  24427  376 -24429 0
 24425  24426  24427  376  24430 0

c  -1-1 --> -2
c    ( b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧  b^{376, 1}_0 ∧ -p_376) -> ( b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0)
c  in CNF:
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨  b^{376, 2}_2
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨  b^{376, 2}_1
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨  p_376 ∨ -b^{376, 2}_0
c  in DIMACS:
-24425  24426 -24427  376  24428 0
-24425  24426 -24427  376  24429 0
-24425  24426 -24427  376 -24430 0

c  -2-1 --> break 
c    ( b^{376, 1}_2 ∧  b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧ -p_376) -> break
c  in CNF:
c    -b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨  b^{376, 1}_0 ∨  p_376 ∨ break
c  in DIMACS:
-24425 -24426  24427  376 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{376, 1}_2 ∧ -b^{376, 1}_1 ∧ -b^{376, 1}_0 ∧ true) 
c  in CNF:
c    -b^{376, 1}_2 ∨  b^{376, 1}_1 ∨  b^{376, 1}_0 ∨ false 
c  in DIMACS:
-24425  24426  24427  0

c  3 does not represent an automaton state.
c    -(-b^{376, 1}_2 ∧  b^{376, 1}_1 ∧  b^{376, 1}_0 ∧ true) 
c  in CNF:
c     b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ false 
c  in DIMACS:
 24425 -24426 -24427  0
c  -3 does not represent an automaton state.
c    -( b^{376, 1}_2 ∧  b^{376, 1}_1 ∧  b^{376, 1}_0 ∧ true) 
c  in CNF:
c    -b^{376, 1}_2 ∨ -b^{376, 1}_1 ∨ -b^{376, 1}_0 ∨ false 
c  in DIMACS:
-24425 -24426 -24427  0

c i = 2
c  -2+1 --> -1
c    ( b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧  p_752) -> ( b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0)
c  in CNF:
c    -b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨  b^{376, 3}_2
c    -b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_1
c    -b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨  b^{376, 3}_0
c  in DIMACS:
-24428 -24429  24430 -752  24431 0
-24428 -24429  24430 -752 -24432 0
-24428 -24429  24430 -752  24433 0

c  -1+1 --> 0
c    ( b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0 ∧  p_752) -> (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧ -b^{376, 3}_0)
c  in CNF:
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_2
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_1
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_0
c  in DIMACS:
-24428  24429 -24430 -752 -24431 0
-24428  24429 -24430 -752 -24432 0
-24428  24429 -24430 -752 -24433 0

c  0+1 --> 1
c    (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧  p_752) -> (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0)
c  in CNF:
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_2
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_1
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨  b^{376, 3}_0
c  in DIMACS:
 24428  24429  24430 -752 -24431 0
 24428  24429  24430 -752 -24432 0
 24428  24429  24430 -752  24433 0

c  1+1 --> 2
c    (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0 ∧  p_752) -> (-b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0)
c  in CNF:
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_2
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨  b^{376, 3}_1
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ -p_752 ∨ -b^{376, 3}_0
c  in DIMACS:
 24428  24429 -24430 -752 -24431 0
 24428  24429 -24430 -752  24432 0
 24428  24429 -24430 -752 -24433 0

c  2+1 --> break 
c    (-b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧  p_752) -> break
c  in CNF:
c     b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ -p_752 ∨ break
c  in DIMACS:
 24428 -24429  24430 -752 1162 0


c  2-1 --> 1
c    (-b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧ -p_752) -> (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0)
c  in CNF:
c     b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_2
c     b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_1
c     b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨  b^{376, 3}_0
c  in DIMACS:
 24428 -24429  24430  752 -24431 0
 24428 -24429  24430  752 -24432 0
 24428 -24429  24430  752  24433 0

c  1-1 --> 0
c    (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0 ∧ -p_752) -> (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧ -b^{376, 3}_0)
c  in CNF:
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_2
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_1
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_0
c  in DIMACS:
 24428  24429 -24430  752 -24431 0
 24428  24429 -24430  752 -24432 0
 24428  24429 -24430  752 -24433 0

c  0-1 --> -1
c    (-b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧ -p_752) -> ( b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0)
c  in CNF:
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨  b^{376, 3}_2
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_1
c     b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨  b^{376, 3}_0
c  in DIMACS:
 24428  24429  24430  752  24431 0
 24428  24429  24430  752 -24432 0
 24428  24429  24430  752  24433 0

c  -1-1 --> -2
c    ( b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧  b^{376, 2}_0 ∧ -p_752) -> ( b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0)
c  in CNF:
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨  b^{376, 3}_2
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨  b^{376, 3}_1
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨  p_752 ∨ -b^{376, 3}_0
c  in DIMACS:
-24428  24429 -24430  752  24431 0
-24428  24429 -24430  752  24432 0
-24428  24429 -24430  752 -24433 0

c  -2-1 --> break 
c    ( b^{376, 2}_2 ∧  b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧ -p_752) -> break
c  in CNF:
c    -b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨  b^{376, 2}_0 ∨  p_752 ∨ break
c  in DIMACS:
-24428 -24429  24430  752 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{376, 2}_2 ∧ -b^{376, 2}_1 ∧ -b^{376, 2}_0 ∧ true) 
c  in CNF:
c    -b^{376, 2}_2 ∨  b^{376, 2}_1 ∨  b^{376, 2}_0 ∨ false 
c  in DIMACS:
-24428  24429  24430  0

c  3 does not represent an automaton state.
c    -(-b^{376, 2}_2 ∧  b^{376, 2}_1 ∧  b^{376, 2}_0 ∧ true) 
c  in CNF:
c     b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ false 
c  in DIMACS:
 24428 -24429 -24430  0
c  -3 does not represent an automaton state.
c    -( b^{376, 2}_2 ∧  b^{376, 2}_1 ∧  b^{376, 2}_0 ∧ true) 
c  in CNF:
c    -b^{376, 2}_2 ∨ -b^{376, 2}_1 ∨ -b^{376, 2}_0 ∨ false 
c  in DIMACS:
-24428 -24429 -24430  0

c i = 3
c  -2+1 --> -1
c    ( b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧  p_1128) -> ( b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧  b^{376, 4}_0)
c  in CNF:
c    -b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨  b^{376, 4}_2
c    -b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_1
c    -b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨  b^{376, 4}_0
c  in DIMACS:
-24431 -24432  24433 -1128  24434 0
-24431 -24432  24433 -1128 -24435 0
-24431 -24432  24433 -1128  24436 0

c  -1+1 --> 0
c    ( b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0 ∧  p_1128) -> (-b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧ -b^{376, 4}_0)
c  in CNF:
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_2
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_1
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_0
c  in DIMACS:
-24431  24432 -24433 -1128 -24434 0
-24431  24432 -24433 -1128 -24435 0
-24431  24432 -24433 -1128 -24436 0

c  0+1 --> 1
c    (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧  p_1128) -> (-b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧  b^{376, 4}_0)
c  in CNF:
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_2
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_1
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨  b^{376, 4}_0
c  in DIMACS:
 24431  24432  24433 -1128 -24434 0
 24431  24432  24433 -1128 -24435 0
 24431  24432  24433 -1128  24436 0

c  1+1 --> 2
c    (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0 ∧  p_1128) -> (-b^{376, 4}_2 ∧  b^{376, 4}_1 ∧ -b^{376, 4}_0)
c  in CNF:
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_2
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨  b^{376, 4}_1
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ -p_1128 ∨ -b^{376, 4}_0
c  in DIMACS:
 24431  24432 -24433 -1128 -24434 0
 24431  24432 -24433 -1128  24435 0
 24431  24432 -24433 -1128 -24436 0

c  2+1 --> break 
c    (-b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧  p_1128) -> break
c  in CNF:
c     b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ -p_1128 ∨ break
c  in DIMACS:
 24431 -24432  24433 -1128 1162 0


c  2-1 --> 1
c    (-b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧ -p_1128) -> (-b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧  b^{376, 4}_0)
c  in CNF:
c     b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_2
c     b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_1
c     b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨  b^{376, 4}_0
c  in DIMACS:
 24431 -24432  24433  1128 -24434 0
 24431 -24432  24433  1128 -24435 0
 24431 -24432  24433  1128  24436 0

c  1-1 --> 0
c    (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0 ∧ -p_1128) -> (-b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧ -b^{376, 4}_0)
c  in CNF:
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_2
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_1
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_0
c  in DIMACS:
 24431  24432 -24433  1128 -24434 0
 24431  24432 -24433  1128 -24435 0
 24431  24432 -24433  1128 -24436 0

c  0-1 --> -1
c    (-b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧ -p_1128) -> ( b^{376, 4}_2 ∧ -b^{376, 4}_1 ∧  b^{376, 4}_0)
c  in CNF:
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨  b^{376, 4}_2
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_1
c     b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨  b^{376, 4}_0
c  in DIMACS:
 24431  24432  24433  1128  24434 0
 24431  24432  24433  1128 -24435 0
 24431  24432  24433  1128  24436 0

c  -1-1 --> -2
c    ( b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧  b^{376, 3}_0 ∧ -p_1128) -> ( b^{376, 4}_2 ∧  b^{376, 4}_1 ∧ -b^{376, 4}_0)
c  in CNF:
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨  b^{376, 4}_2
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨  b^{376, 4}_1
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨  p_1128 ∨ -b^{376, 4}_0
c  in DIMACS:
-24431  24432 -24433  1128  24434 0
-24431  24432 -24433  1128  24435 0
-24431  24432 -24433  1128 -24436 0

c  -2-1 --> break 
c    ( b^{376, 3}_2 ∧  b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧ -p_1128) -> break
c  in CNF:
c    -b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨  b^{376, 3}_0 ∨  p_1128 ∨ break
c  in DIMACS:
-24431 -24432  24433  1128 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{376, 3}_2 ∧ -b^{376, 3}_1 ∧ -b^{376, 3}_0 ∧ true) 
c  in CNF:
c    -b^{376, 3}_2 ∨  b^{376, 3}_1 ∨  b^{376, 3}_0 ∨ false 
c  in DIMACS:
-24431  24432  24433  0

c  3 does not represent an automaton state.
c    -(-b^{376, 3}_2 ∧  b^{376, 3}_1 ∧  b^{376, 3}_0 ∧ true) 
c  in CNF:
c     b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ false 
c  in DIMACS:
 24431 -24432 -24433  0
c  -3 does not represent an automaton state.
c    -( b^{376, 3}_2 ∧  b^{376, 3}_1 ∧  b^{376, 3}_0 ∧ true) 
c  in CNF:
c    -b^{376, 3}_2 ∨ -b^{376, 3}_1 ∨ -b^{376, 3}_0 ∨ false 
c  in DIMACS:
-24431 -24432 -24433  0

c INIT for k = 377
c    -b^{377, 1}_2
c    -b^{377, 1}_1
c    -b^{377, 1}_0
c  in DIMACS:
-24437 0
-24438 0
-24439 0

c Transitions for k = 377
c i = 1
c  -2+1 --> -1
c    ( b^{377, 1}_2 ∧  b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧  p_377) -> ( b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0)
c  in CNF:
c    -b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨  b^{377, 2}_2
c    -b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_1
c    -b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨  b^{377, 2}_0
c  in DIMACS:
-24437 -24438  24439 -377  24440 0
-24437 -24438  24439 -377 -24441 0
-24437 -24438  24439 -377  24442 0

c  -1+1 --> 0
c    ( b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧  b^{377, 1}_0 ∧  p_377) -> (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧ -b^{377, 2}_0)
c  in CNF:
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_2
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_1
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_0
c  in DIMACS:
-24437  24438 -24439 -377 -24440 0
-24437  24438 -24439 -377 -24441 0
-24437  24438 -24439 -377 -24442 0

c  0+1 --> 1
c    (-b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧  p_377) -> (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0)
c  in CNF:
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_2
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_1
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨  b^{377, 2}_0
c  in DIMACS:
 24437  24438  24439 -377 -24440 0
 24437  24438  24439 -377 -24441 0
 24437  24438  24439 -377  24442 0

c  1+1 --> 2
c    (-b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧  b^{377, 1}_0 ∧  p_377) -> (-b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0)
c  in CNF:
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_2
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨  b^{377, 2}_1
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ -p_377 ∨ -b^{377, 2}_0
c  in DIMACS:
 24437  24438 -24439 -377 -24440 0
 24437  24438 -24439 -377  24441 0
 24437  24438 -24439 -377 -24442 0

c  2+1 --> break 
c    (-b^{377, 1}_2 ∧  b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧  p_377) -> break
c  in CNF:
c     b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ -p_377 ∨ break
c  in DIMACS:
 24437 -24438  24439 -377 1162 0


c  2-1 --> 1
c    (-b^{377, 1}_2 ∧  b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧ -p_377) -> (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0)
c  in CNF:
c     b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_2
c     b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_1
c     b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨  b^{377, 2}_0
c  in DIMACS:
 24437 -24438  24439  377 -24440 0
 24437 -24438  24439  377 -24441 0
 24437 -24438  24439  377  24442 0

c  1-1 --> 0
c    (-b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧  b^{377, 1}_0 ∧ -p_377) -> (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧ -b^{377, 2}_0)
c  in CNF:
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_2
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_1
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_0
c  in DIMACS:
 24437  24438 -24439  377 -24440 0
 24437  24438 -24439  377 -24441 0
 24437  24438 -24439  377 -24442 0

c  0-1 --> -1
c    (-b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧ -p_377) -> ( b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0)
c  in CNF:
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨  b^{377, 2}_2
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_1
c     b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨  b^{377, 2}_0
c  in DIMACS:
 24437  24438  24439  377  24440 0
 24437  24438  24439  377 -24441 0
 24437  24438  24439  377  24442 0

c  -1-1 --> -2
c    ( b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧  b^{377, 1}_0 ∧ -p_377) -> ( b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0)
c  in CNF:
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨  b^{377, 2}_2
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨  b^{377, 2}_1
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨  p_377 ∨ -b^{377, 2}_0
c  in DIMACS:
-24437  24438 -24439  377  24440 0
-24437  24438 -24439  377  24441 0
-24437  24438 -24439  377 -24442 0

c  -2-1 --> break 
c    ( b^{377, 1}_2 ∧  b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧ -p_377) -> break
c  in CNF:
c    -b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨  b^{377, 1}_0 ∨  p_377 ∨ break
c  in DIMACS:
-24437 -24438  24439  377 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{377, 1}_2 ∧ -b^{377, 1}_1 ∧ -b^{377, 1}_0 ∧ true) 
c  in CNF:
c    -b^{377, 1}_2 ∨  b^{377, 1}_1 ∨  b^{377, 1}_0 ∨ false 
c  in DIMACS:
-24437  24438  24439  0

c  3 does not represent an automaton state.
c    -(-b^{377, 1}_2 ∧  b^{377, 1}_1 ∧  b^{377, 1}_0 ∧ true) 
c  in CNF:
c     b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ false 
c  in DIMACS:
 24437 -24438 -24439  0
c  -3 does not represent an automaton state.
c    -( b^{377, 1}_2 ∧  b^{377, 1}_1 ∧  b^{377, 1}_0 ∧ true) 
c  in CNF:
c    -b^{377, 1}_2 ∨ -b^{377, 1}_1 ∨ -b^{377, 1}_0 ∨ false 
c  in DIMACS:
-24437 -24438 -24439  0

c i = 2
c  -2+1 --> -1
c    ( b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧  p_754) -> ( b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0)
c  in CNF:
c    -b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨  b^{377, 3}_2
c    -b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_1
c    -b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨  b^{377, 3}_0
c  in DIMACS:
-24440 -24441  24442 -754  24443 0
-24440 -24441  24442 -754 -24444 0
-24440 -24441  24442 -754  24445 0

c  -1+1 --> 0
c    ( b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0 ∧  p_754) -> (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧ -b^{377, 3}_0)
c  in CNF:
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_2
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_1
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_0
c  in DIMACS:
-24440  24441 -24442 -754 -24443 0
-24440  24441 -24442 -754 -24444 0
-24440  24441 -24442 -754 -24445 0

c  0+1 --> 1
c    (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧  p_754) -> (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0)
c  in CNF:
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_2
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_1
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨  b^{377, 3}_0
c  in DIMACS:
 24440  24441  24442 -754 -24443 0
 24440  24441  24442 -754 -24444 0
 24440  24441  24442 -754  24445 0

c  1+1 --> 2
c    (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0 ∧  p_754) -> (-b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0)
c  in CNF:
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_2
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨  b^{377, 3}_1
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ -p_754 ∨ -b^{377, 3}_0
c  in DIMACS:
 24440  24441 -24442 -754 -24443 0
 24440  24441 -24442 -754  24444 0
 24440  24441 -24442 -754 -24445 0

c  2+1 --> break 
c    (-b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧  p_754) -> break
c  in CNF:
c     b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ -p_754 ∨ break
c  in DIMACS:
 24440 -24441  24442 -754 1162 0


c  2-1 --> 1
c    (-b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧ -p_754) -> (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0)
c  in CNF:
c     b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_2
c     b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_1
c     b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨  b^{377, 3}_0
c  in DIMACS:
 24440 -24441  24442  754 -24443 0
 24440 -24441  24442  754 -24444 0
 24440 -24441  24442  754  24445 0

c  1-1 --> 0
c    (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0 ∧ -p_754) -> (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧ -b^{377, 3}_0)
c  in CNF:
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_2
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_1
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_0
c  in DIMACS:
 24440  24441 -24442  754 -24443 0
 24440  24441 -24442  754 -24444 0
 24440  24441 -24442  754 -24445 0

c  0-1 --> -1
c    (-b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧ -p_754) -> ( b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0)
c  in CNF:
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨  b^{377, 3}_2
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_1
c     b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨  b^{377, 3}_0
c  in DIMACS:
 24440  24441  24442  754  24443 0
 24440  24441  24442  754 -24444 0
 24440  24441  24442  754  24445 0

c  -1-1 --> -2
c    ( b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧  b^{377, 2}_0 ∧ -p_754) -> ( b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0)
c  in CNF:
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨  b^{377, 3}_2
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨  b^{377, 3}_1
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨  p_754 ∨ -b^{377, 3}_0
c  in DIMACS:
-24440  24441 -24442  754  24443 0
-24440  24441 -24442  754  24444 0
-24440  24441 -24442  754 -24445 0

c  -2-1 --> break 
c    ( b^{377, 2}_2 ∧  b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧ -p_754) -> break
c  in CNF:
c    -b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨  b^{377, 2}_0 ∨  p_754 ∨ break
c  in DIMACS:
-24440 -24441  24442  754 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{377, 2}_2 ∧ -b^{377, 2}_1 ∧ -b^{377, 2}_0 ∧ true) 
c  in CNF:
c    -b^{377, 2}_2 ∨  b^{377, 2}_1 ∨  b^{377, 2}_0 ∨ false 
c  in DIMACS:
-24440  24441  24442  0

c  3 does not represent an automaton state.
c    -(-b^{377, 2}_2 ∧  b^{377, 2}_1 ∧  b^{377, 2}_0 ∧ true) 
c  in CNF:
c     b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ false 
c  in DIMACS:
 24440 -24441 -24442  0
c  -3 does not represent an automaton state.
c    -( b^{377, 2}_2 ∧  b^{377, 2}_1 ∧  b^{377, 2}_0 ∧ true) 
c  in CNF:
c    -b^{377, 2}_2 ∨ -b^{377, 2}_1 ∨ -b^{377, 2}_0 ∨ false 
c  in DIMACS:
-24440 -24441 -24442  0

c i = 3
c  -2+1 --> -1
c    ( b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧  p_1131) -> ( b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧  b^{377, 4}_0)
c  in CNF:
c    -b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨  b^{377, 4}_2
c    -b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_1
c    -b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨  b^{377, 4}_0
c  in DIMACS:
-24443 -24444  24445 -1131  24446 0
-24443 -24444  24445 -1131 -24447 0
-24443 -24444  24445 -1131  24448 0

c  -1+1 --> 0
c    ( b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0 ∧  p_1131) -> (-b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧ -b^{377, 4}_0)
c  in CNF:
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_2
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_1
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_0
c  in DIMACS:
-24443  24444 -24445 -1131 -24446 0
-24443  24444 -24445 -1131 -24447 0
-24443  24444 -24445 -1131 -24448 0

c  0+1 --> 1
c    (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧  p_1131) -> (-b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧  b^{377, 4}_0)
c  in CNF:
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_2
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_1
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨  b^{377, 4}_0
c  in DIMACS:
 24443  24444  24445 -1131 -24446 0
 24443  24444  24445 -1131 -24447 0
 24443  24444  24445 -1131  24448 0

c  1+1 --> 2
c    (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0 ∧  p_1131) -> (-b^{377, 4}_2 ∧  b^{377, 4}_1 ∧ -b^{377, 4}_0)
c  in CNF:
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_2
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨  b^{377, 4}_1
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ -p_1131 ∨ -b^{377, 4}_0
c  in DIMACS:
 24443  24444 -24445 -1131 -24446 0
 24443  24444 -24445 -1131  24447 0
 24443  24444 -24445 -1131 -24448 0

c  2+1 --> break 
c    (-b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧  p_1131) -> break
c  in CNF:
c     b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ -p_1131 ∨ break
c  in DIMACS:
 24443 -24444  24445 -1131 1162 0


c  2-1 --> 1
c    (-b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧ -p_1131) -> (-b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧  b^{377, 4}_0)
c  in CNF:
c     b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_2
c     b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_1
c     b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨  b^{377, 4}_0
c  in DIMACS:
 24443 -24444  24445  1131 -24446 0
 24443 -24444  24445  1131 -24447 0
 24443 -24444  24445  1131  24448 0

c  1-1 --> 0
c    (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0 ∧ -p_1131) -> (-b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧ -b^{377, 4}_0)
c  in CNF:
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_2
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_1
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_0
c  in DIMACS:
 24443  24444 -24445  1131 -24446 0
 24443  24444 -24445  1131 -24447 0
 24443  24444 -24445  1131 -24448 0

c  0-1 --> -1
c    (-b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧ -p_1131) -> ( b^{377, 4}_2 ∧ -b^{377, 4}_1 ∧  b^{377, 4}_0)
c  in CNF:
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨  b^{377, 4}_2
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_1
c     b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨  b^{377, 4}_0
c  in DIMACS:
 24443  24444  24445  1131  24446 0
 24443  24444  24445  1131 -24447 0
 24443  24444  24445  1131  24448 0

c  -1-1 --> -2
c    ( b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧  b^{377, 3}_0 ∧ -p_1131) -> ( b^{377, 4}_2 ∧  b^{377, 4}_1 ∧ -b^{377, 4}_0)
c  in CNF:
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨  b^{377, 4}_2
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨  b^{377, 4}_1
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨  p_1131 ∨ -b^{377, 4}_0
c  in DIMACS:
-24443  24444 -24445  1131  24446 0
-24443  24444 -24445  1131  24447 0
-24443  24444 -24445  1131 -24448 0

c  -2-1 --> break 
c    ( b^{377, 3}_2 ∧  b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧ -p_1131) -> break
c  in CNF:
c    -b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨  b^{377, 3}_0 ∨  p_1131 ∨ break
c  in DIMACS:
-24443 -24444  24445  1131 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{377, 3}_2 ∧ -b^{377, 3}_1 ∧ -b^{377, 3}_0 ∧ true) 
c  in CNF:
c    -b^{377, 3}_2 ∨  b^{377, 3}_1 ∨  b^{377, 3}_0 ∨ false 
c  in DIMACS:
-24443  24444  24445  0

c  3 does not represent an automaton state.
c    -(-b^{377, 3}_2 ∧  b^{377, 3}_1 ∧  b^{377, 3}_0 ∧ true) 
c  in CNF:
c     b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ false 
c  in DIMACS:
 24443 -24444 -24445  0
c  -3 does not represent an automaton state.
c    -( b^{377, 3}_2 ∧  b^{377, 3}_1 ∧  b^{377, 3}_0 ∧ true) 
c  in CNF:
c    -b^{377, 3}_2 ∨ -b^{377, 3}_1 ∨ -b^{377, 3}_0 ∨ false 
c  in DIMACS:
-24443 -24444 -24445  0

c INIT for k = 378
c    -b^{378, 1}_2
c    -b^{378, 1}_1
c    -b^{378, 1}_0
c  in DIMACS:
-24449 0
-24450 0
-24451 0

c Transitions for k = 378
c i = 1
c  -2+1 --> -1
c    ( b^{378, 1}_2 ∧  b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧  p_378) -> ( b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0)
c  in CNF:
c    -b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨  b^{378, 2}_2
c    -b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_1
c    -b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨  b^{378, 2}_0
c  in DIMACS:
-24449 -24450  24451 -378  24452 0
-24449 -24450  24451 -378 -24453 0
-24449 -24450  24451 -378  24454 0

c  -1+1 --> 0
c    ( b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧  b^{378, 1}_0 ∧  p_378) -> (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧ -b^{378, 2}_0)
c  in CNF:
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_2
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_1
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_0
c  in DIMACS:
-24449  24450 -24451 -378 -24452 0
-24449  24450 -24451 -378 -24453 0
-24449  24450 -24451 -378 -24454 0

c  0+1 --> 1
c    (-b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧  p_378) -> (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0)
c  in CNF:
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_2
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_1
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨  b^{378, 2}_0
c  in DIMACS:
 24449  24450  24451 -378 -24452 0
 24449  24450  24451 -378 -24453 0
 24449  24450  24451 -378  24454 0

c  1+1 --> 2
c    (-b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧  b^{378, 1}_0 ∧  p_378) -> (-b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0)
c  in CNF:
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_2
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨  b^{378, 2}_1
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ -p_378 ∨ -b^{378, 2}_0
c  in DIMACS:
 24449  24450 -24451 -378 -24452 0
 24449  24450 -24451 -378  24453 0
 24449  24450 -24451 -378 -24454 0

c  2+1 --> break 
c    (-b^{378, 1}_2 ∧  b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧  p_378) -> break
c  in CNF:
c     b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ -p_378 ∨ break
c  in DIMACS:
 24449 -24450  24451 -378 1162 0


c  2-1 --> 1
c    (-b^{378, 1}_2 ∧  b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧ -p_378) -> (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0)
c  in CNF:
c     b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_2
c     b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_1
c     b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨  b^{378, 2}_0
c  in DIMACS:
 24449 -24450  24451  378 -24452 0
 24449 -24450  24451  378 -24453 0
 24449 -24450  24451  378  24454 0

c  1-1 --> 0
c    (-b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧  b^{378, 1}_0 ∧ -p_378) -> (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧ -b^{378, 2}_0)
c  in CNF:
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_2
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_1
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_0
c  in DIMACS:
 24449  24450 -24451  378 -24452 0
 24449  24450 -24451  378 -24453 0
 24449  24450 -24451  378 -24454 0

c  0-1 --> -1
c    (-b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧ -p_378) -> ( b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0)
c  in CNF:
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨  b^{378, 2}_2
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_1
c     b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨  b^{378, 2}_0
c  in DIMACS:
 24449  24450  24451  378  24452 0
 24449  24450  24451  378 -24453 0
 24449  24450  24451  378  24454 0

c  -1-1 --> -2
c    ( b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧  b^{378, 1}_0 ∧ -p_378) -> ( b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0)
c  in CNF:
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨  b^{378, 2}_2
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨  b^{378, 2}_1
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨  p_378 ∨ -b^{378, 2}_0
c  in DIMACS:
-24449  24450 -24451  378  24452 0
-24449  24450 -24451  378  24453 0
-24449  24450 -24451  378 -24454 0

c  -2-1 --> break 
c    ( b^{378, 1}_2 ∧  b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧ -p_378) -> break
c  in CNF:
c    -b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨  b^{378, 1}_0 ∨  p_378 ∨ break
c  in DIMACS:
-24449 -24450  24451  378 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{378, 1}_2 ∧ -b^{378, 1}_1 ∧ -b^{378, 1}_0 ∧ true) 
c  in CNF:
c    -b^{378, 1}_2 ∨  b^{378, 1}_1 ∨  b^{378, 1}_0 ∨ false 
c  in DIMACS:
-24449  24450  24451  0

c  3 does not represent an automaton state.
c    -(-b^{378, 1}_2 ∧  b^{378, 1}_1 ∧  b^{378, 1}_0 ∧ true) 
c  in CNF:
c     b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ false 
c  in DIMACS:
 24449 -24450 -24451  0
c  -3 does not represent an automaton state.
c    -( b^{378, 1}_2 ∧  b^{378, 1}_1 ∧  b^{378, 1}_0 ∧ true) 
c  in CNF:
c    -b^{378, 1}_2 ∨ -b^{378, 1}_1 ∨ -b^{378, 1}_0 ∨ false 
c  in DIMACS:
-24449 -24450 -24451  0

c i = 2
c  -2+1 --> -1
c    ( b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧  p_756) -> ( b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0)
c  in CNF:
c    -b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨  b^{378, 3}_2
c    -b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_1
c    -b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨  b^{378, 3}_0
c  in DIMACS:
-24452 -24453  24454 -756  24455 0
-24452 -24453  24454 -756 -24456 0
-24452 -24453  24454 -756  24457 0

c  -1+1 --> 0
c    ( b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0 ∧  p_756) -> (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧ -b^{378, 3}_0)
c  in CNF:
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_2
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_1
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_0
c  in DIMACS:
-24452  24453 -24454 -756 -24455 0
-24452  24453 -24454 -756 -24456 0
-24452  24453 -24454 -756 -24457 0

c  0+1 --> 1
c    (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧  p_756) -> (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0)
c  in CNF:
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_2
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_1
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨  b^{378, 3}_0
c  in DIMACS:
 24452  24453  24454 -756 -24455 0
 24452  24453  24454 -756 -24456 0
 24452  24453  24454 -756  24457 0

c  1+1 --> 2
c    (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0 ∧  p_756) -> (-b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0)
c  in CNF:
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_2
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨  b^{378, 3}_1
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ -p_756 ∨ -b^{378, 3}_0
c  in DIMACS:
 24452  24453 -24454 -756 -24455 0
 24452  24453 -24454 -756  24456 0
 24452  24453 -24454 -756 -24457 0

c  2+1 --> break 
c    (-b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧  p_756) -> break
c  in CNF:
c     b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ -p_756 ∨ break
c  in DIMACS:
 24452 -24453  24454 -756 1162 0


c  2-1 --> 1
c    (-b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧ -p_756) -> (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0)
c  in CNF:
c     b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_2
c     b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_1
c     b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨  b^{378, 3}_0
c  in DIMACS:
 24452 -24453  24454  756 -24455 0
 24452 -24453  24454  756 -24456 0
 24452 -24453  24454  756  24457 0

c  1-1 --> 0
c    (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0 ∧ -p_756) -> (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧ -b^{378, 3}_0)
c  in CNF:
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_2
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_1
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_0
c  in DIMACS:
 24452  24453 -24454  756 -24455 0
 24452  24453 -24454  756 -24456 0
 24452  24453 -24454  756 -24457 0

c  0-1 --> -1
c    (-b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧ -p_756) -> ( b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0)
c  in CNF:
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨  b^{378, 3}_2
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_1
c     b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨  b^{378, 3}_0
c  in DIMACS:
 24452  24453  24454  756  24455 0
 24452  24453  24454  756 -24456 0
 24452  24453  24454  756  24457 0

c  -1-1 --> -2
c    ( b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧  b^{378, 2}_0 ∧ -p_756) -> ( b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0)
c  in CNF:
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨  b^{378, 3}_2
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨  b^{378, 3}_1
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨  p_756 ∨ -b^{378, 3}_0
c  in DIMACS:
-24452  24453 -24454  756  24455 0
-24452  24453 -24454  756  24456 0
-24452  24453 -24454  756 -24457 0

c  -2-1 --> break 
c    ( b^{378, 2}_2 ∧  b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧ -p_756) -> break
c  in CNF:
c    -b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨  b^{378, 2}_0 ∨  p_756 ∨ break
c  in DIMACS:
-24452 -24453  24454  756 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{378, 2}_2 ∧ -b^{378, 2}_1 ∧ -b^{378, 2}_0 ∧ true) 
c  in CNF:
c    -b^{378, 2}_2 ∨  b^{378, 2}_1 ∨  b^{378, 2}_0 ∨ false 
c  in DIMACS:
-24452  24453  24454  0

c  3 does not represent an automaton state.
c    -(-b^{378, 2}_2 ∧  b^{378, 2}_1 ∧  b^{378, 2}_0 ∧ true) 
c  in CNF:
c     b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ false 
c  in DIMACS:
 24452 -24453 -24454  0
c  -3 does not represent an automaton state.
c    -( b^{378, 2}_2 ∧  b^{378, 2}_1 ∧  b^{378, 2}_0 ∧ true) 
c  in CNF:
c    -b^{378, 2}_2 ∨ -b^{378, 2}_1 ∨ -b^{378, 2}_0 ∨ false 
c  in DIMACS:
-24452 -24453 -24454  0

c i = 3
c  -2+1 --> -1
c    ( b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧  p_1134) -> ( b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧  b^{378, 4}_0)
c  in CNF:
c    -b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨  b^{378, 4}_2
c    -b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_1
c    -b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨  b^{378, 4}_0
c  in DIMACS:
-24455 -24456  24457 -1134  24458 0
-24455 -24456  24457 -1134 -24459 0
-24455 -24456  24457 -1134  24460 0

c  -1+1 --> 0
c    ( b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0 ∧  p_1134) -> (-b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧ -b^{378, 4}_0)
c  in CNF:
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_2
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_1
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_0
c  in DIMACS:
-24455  24456 -24457 -1134 -24458 0
-24455  24456 -24457 -1134 -24459 0
-24455  24456 -24457 -1134 -24460 0

c  0+1 --> 1
c    (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧  p_1134) -> (-b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧  b^{378, 4}_0)
c  in CNF:
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_2
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_1
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨  b^{378, 4}_0
c  in DIMACS:
 24455  24456  24457 -1134 -24458 0
 24455  24456  24457 -1134 -24459 0
 24455  24456  24457 -1134  24460 0

c  1+1 --> 2
c    (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0 ∧  p_1134) -> (-b^{378, 4}_2 ∧  b^{378, 4}_1 ∧ -b^{378, 4}_0)
c  in CNF:
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_2
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨  b^{378, 4}_1
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ -p_1134 ∨ -b^{378, 4}_0
c  in DIMACS:
 24455  24456 -24457 -1134 -24458 0
 24455  24456 -24457 -1134  24459 0
 24455  24456 -24457 -1134 -24460 0

c  2+1 --> break 
c    (-b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧  p_1134) -> break
c  in CNF:
c     b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ -p_1134 ∨ break
c  in DIMACS:
 24455 -24456  24457 -1134 1162 0


c  2-1 --> 1
c    (-b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧ -p_1134) -> (-b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧  b^{378, 4}_0)
c  in CNF:
c     b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_2
c     b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_1
c     b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨  b^{378, 4}_0
c  in DIMACS:
 24455 -24456  24457  1134 -24458 0
 24455 -24456  24457  1134 -24459 0
 24455 -24456  24457  1134  24460 0

c  1-1 --> 0
c    (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0 ∧ -p_1134) -> (-b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧ -b^{378, 4}_0)
c  in CNF:
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_2
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_1
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_0
c  in DIMACS:
 24455  24456 -24457  1134 -24458 0
 24455  24456 -24457  1134 -24459 0
 24455  24456 -24457  1134 -24460 0

c  0-1 --> -1
c    (-b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧ -p_1134) -> ( b^{378, 4}_2 ∧ -b^{378, 4}_1 ∧  b^{378, 4}_0)
c  in CNF:
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨  b^{378, 4}_2
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_1
c     b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨  b^{378, 4}_0
c  in DIMACS:
 24455  24456  24457  1134  24458 0
 24455  24456  24457  1134 -24459 0
 24455  24456  24457  1134  24460 0

c  -1-1 --> -2
c    ( b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧  b^{378, 3}_0 ∧ -p_1134) -> ( b^{378, 4}_2 ∧  b^{378, 4}_1 ∧ -b^{378, 4}_0)
c  in CNF:
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨  b^{378, 4}_2
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨  b^{378, 4}_1
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨  p_1134 ∨ -b^{378, 4}_0
c  in DIMACS:
-24455  24456 -24457  1134  24458 0
-24455  24456 -24457  1134  24459 0
-24455  24456 -24457  1134 -24460 0

c  -2-1 --> break 
c    ( b^{378, 3}_2 ∧  b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧ -p_1134) -> break
c  in CNF:
c    -b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨  b^{378, 3}_0 ∨  p_1134 ∨ break
c  in DIMACS:
-24455 -24456  24457  1134 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{378, 3}_2 ∧ -b^{378, 3}_1 ∧ -b^{378, 3}_0 ∧ true) 
c  in CNF:
c    -b^{378, 3}_2 ∨  b^{378, 3}_1 ∨  b^{378, 3}_0 ∨ false 
c  in DIMACS:
-24455  24456  24457  0

c  3 does not represent an automaton state.
c    -(-b^{378, 3}_2 ∧  b^{378, 3}_1 ∧  b^{378, 3}_0 ∧ true) 
c  in CNF:
c     b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ false 
c  in DIMACS:
 24455 -24456 -24457  0
c  -3 does not represent an automaton state.
c    -( b^{378, 3}_2 ∧  b^{378, 3}_1 ∧  b^{378, 3}_0 ∧ true) 
c  in CNF:
c    -b^{378, 3}_2 ∨ -b^{378, 3}_1 ∨ -b^{378, 3}_0 ∨ false 
c  in DIMACS:
-24455 -24456 -24457  0

c INIT for k = 379
c    -b^{379, 1}_2
c    -b^{379, 1}_1
c    -b^{379, 1}_0
c  in DIMACS:
-24461 0
-24462 0
-24463 0

c Transitions for k = 379
c i = 1
c  -2+1 --> -1
c    ( b^{379, 1}_2 ∧  b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧  p_379) -> ( b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0)
c  in CNF:
c    -b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨  b^{379, 2}_2
c    -b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_1
c    -b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨  b^{379, 2}_0
c  in DIMACS:
-24461 -24462  24463 -379  24464 0
-24461 -24462  24463 -379 -24465 0
-24461 -24462  24463 -379  24466 0

c  -1+1 --> 0
c    ( b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧  b^{379, 1}_0 ∧  p_379) -> (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧ -b^{379, 2}_0)
c  in CNF:
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_2
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_1
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_0
c  in DIMACS:
-24461  24462 -24463 -379 -24464 0
-24461  24462 -24463 -379 -24465 0
-24461  24462 -24463 -379 -24466 0

c  0+1 --> 1
c    (-b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧  p_379) -> (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0)
c  in CNF:
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_2
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_1
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨  b^{379, 2}_0
c  in DIMACS:
 24461  24462  24463 -379 -24464 0
 24461  24462  24463 -379 -24465 0
 24461  24462  24463 -379  24466 0

c  1+1 --> 2
c    (-b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧  b^{379, 1}_0 ∧  p_379) -> (-b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0)
c  in CNF:
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_2
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨  b^{379, 2}_1
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ -p_379 ∨ -b^{379, 2}_0
c  in DIMACS:
 24461  24462 -24463 -379 -24464 0
 24461  24462 -24463 -379  24465 0
 24461  24462 -24463 -379 -24466 0

c  2+1 --> break 
c    (-b^{379, 1}_2 ∧  b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧  p_379) -> break
c  in CNF:
c     b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ -p_379 ∨ break
c  in DIMACS:
 24461 -24462  24463 -379 1162 0


c  2-1 --> 1
c    (-b^{379, 1}_2 ∧  b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧ -p_379) -> (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0)
c  in CNF:
c     b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_2
c     b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_1
c     b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨  b^{379, 2}_0
c  in DIMACS:
 24461 -24462  24463  379 -24464 0
 24461 -24462  24463  379 -24465 0
 24461 -24462  24463  379  24466 0

c  1-1 --> 0
c    (-b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧  b^{379, 1}_0 ∧ -p_379) -> (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧ -b^{379, 2}_0)
c  in CNF:
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_2
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_1
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_0
c  in DIMACS:
 24461  24462 -24463  379 -24464 0
 24461  24462 -24463  379 -24465 0
 24461  24462 -24463  379 -24466 0

c  0-1 --> -1
c    (-b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧ -p_379) -> ( b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0)
c  in CNF:
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨  b^{379, 2}_2
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_1
c     b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨  b^{379, 2}_0
c  in DIMACS:
 24461  24462  24463  379  24464 0
 24461  24462  24463  379 -24465 0
 24461  24462  24463  379  24466 0

c  -1-1 --> -2
c    ( b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧  b^{379, 1}_0 ∧ -p_379) -> ( b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0)
c  in CNF:
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨  b^{379, 2}_2
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨  b^{379, 2}_1
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨  p_379 ∨ -b^{379, 2}_0
c  in DIMACS:
-24461  24462 -24463  379  24464 0
-24461  24462 -24463  379  24465 0
-24461  24462 -24463  379 -24466 0

c  -2-1 --> break 
c    ( b^{379, 1}_2 ∧  b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧ -p_379) -> break
c  in CNF:
c    -b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨  b^{379, 1}_0 ∨  p_379 ∨ break
c  in DIMACS:
-24461 -24462  24463  379 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{379, 1}_2 ∧ -b^{379, 1}_1 ∧ -b^{379, 1}_0 ∧ true) 
c  in CNF:
c    -b^{379, 1}_2 ∨  b^{379, 1}_1 ∨  b^{379, 1}_0 ∨ false 
c  in DIMACS:
-24461  24462  24463  0

c  3 does not represent an automaton state.
c    -(-b^{379, 1}_2 ∧  b^{379, 1}_1 ∧  b^{379, 1}_0 ∧ true) 
c  in CNF:
c     b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ false 
c  in DIMACS:
 24461 -24462 -24463  0
c  -3 does not represent an automaton state.
c    -( b^{379, 1}_2 ∧  b^{379, 1}_1 ∧  b^{379, 1}_0 ∧ true) 
c  in CNF:
c    -b^{379, 1}_2 ∨ -b^{379, 1}_1 ∨ -b^{379, 1}_0 ∨ false 
c  in DIMACS:
-24461 -24462 -24463  0

c i = 2
c  -2+1 --> -1
c    ( b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧  p_758) -> ( b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0)
c  in CNF:
c    -b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨  b^{379, 3}_2
c    -b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_1
c    -b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨  b^{379, 3}_0
c  in DIMACS:
-24464 -24465  24466 -758  24467 0
-24464 -24465  24466 -758 -24468 0
-24464 -24465  24466 -758  24469 0

c  -1+1 --> 0
c    ( b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0 ∧  p_758) -> (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧ -b^{379, 3}_0)
c  in CNF:
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_2
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_1
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_0
c  in DIMACS:
-24464  24465 -24466 -758 -24467 0
-24464  24465 -24466 -758 -24468 0
-24464  24465 -24466 -758 -24469 0

c  0+1 --> 1
c    (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧  p_758) -> (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0)
c  in CNF:
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_2
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_1
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨  b^{379, 3}_0
c  in DIMACS:
 24464  24465  24466 -758 -24467 0
 24464  24465  24466 -758 -24468 0
 24464  24465  24466 -758  24469 0

c  1+1 --> 2
c    (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0 ∧  p_758) -> (-b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0)
c  in CNF:
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_2
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨  b^{379, 3}_1
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ -p_758 ∨ -b^{379, 3}_0
c  in DIMACS:
 24464  24465 -24466 -758 -24467 0
 24464  24465 -24466 -758  24468 0
 24464  24465 -24466 -758 -24469 0

c  2+1 --> break 
c    (-b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧  p_758) -> break
c  in CNF:
c     b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ -p_758 ∨ break
c  in DIMACS:
 24464 -24465  24466 -758 1162 0


c  2-1 --> 1
c    (-b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧ -p_758) -> (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0)
c  in CNF:
c     b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_2
c     b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_1
c     b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨  b^{379, 3}_0
c  in DIMACS:
 24464 -24465  24466  758 -24467 0
 24464 -24465  24466  758 -24468 0
 24464 -24465  24466  758  24469 0

c  1-1 --> 0
c    (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0 ∧ -p_758) -> (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧ -b^{379, 3}_0)
c  in CNF:
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_2
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_1
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_0
c  in DIMACS:
 24464  24465 -24466  758 -24467 0
 24464  24465 -24466  758 -24468 0
 24464  24465 -24466  758 -24469 0

c  0-1 --> -1
c    (-b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧ -p_758) -> ( b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0)
c  in CNF:
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨  b^{379, 3}_2
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_1
c     b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨  b^{379, 3}_0
c  in DIMACS:
 24464  24465  24466  758  24467 0
 24464  24465  24466  758 -24468 0
 24464  24465  24466  758  24469 0

c  -1-1 --> -2
c    ( b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧  b^{379, 2}_0 ∧ -p_758) -> ( b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0)
c  in CNF:
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨  b^{379, 3}_2
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨  b^{379, 3}_1
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨  p_758 ∨ -b^{379, 3}_0
c  in DIMACS:
-24464  24465 -24466  758  24467 0
-24464  24465 -24466  758  24468 0
-24464  24465 -24466  758 -24469 0

c  -2-1 --> break 
c    ( b^{379, 2}_2 ∧  b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧ -p_758) -> break
c  in CNF:
c    -b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨  b^{379, 2}_0 ∨  p_758 ∨ break
c  in DIMACS:
-24464 -24465  24466  758 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{379, 2}_2 ∧ -b^{379, 2}_1 ∧ -b^{379, 2}_0 ∧ true) 
c  in CNF:
c    -b^{379, 2}_2 ∨  b^{379, 2}_1 ∨  b^{379, 2}_0 ∨ false 
c  in DIMACS:
-24464  24465  24466  0

c  3 does not represent an automaton state.
c    -(-b^{379, 2}_2 ∧  b^{379, 2}_1 ∧  b^{379, 2}_0 ∧ true) 
c  in CNF:
c     b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ false 
c  in DIMACS:
 24464 -24465 -24466  0
c  -3 does not represent an automaton state.
c    -( b^{379, 2}_2 ∧  b^{379, 2}_1 ∧  b^{379, 2}_0 ∧ true) 
c  in CNF:
c    -b^{379, 2}_2 ∨ -b^{379, 2}_1 ∨ -b^{379, 2}_0 ∨ false 
c  in DIMACS:
-24464 -24465 -24466  0

c i = 3
c  -2+1 --> -1
c    ( b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧  p_1137) -> ( b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧  b^{379, 4}_0)
c  in CNF:
c    -b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨  b^{379, 4}_2
c    -b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_1
c    -b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨  b^{379, 4}_0
c  in DIMACS:
-24467 -24468  24469 -1137  24470 0
-24467 -24468  24469 -1137 -24471 0
-24467 -24468  24469 -1137  24472 0

c  -1+1 --> 0
c    ( b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0 ∧  p_1137) -> (-b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧ -b^{379, 4}_0)
c  in CNF:
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_2
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_1
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_0
c  in DIMACS:
-24467  24468 -24469 -1137 -24470 0
-24467  24468 -24469 -1137 -24471 0
-24467  24468 -24469 -1137 -24472 0

c  0+1 --> 1
c    (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧  p_1137) -> (-b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧  b^{379, 4}_0)
c  in CNF:
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_2
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_1
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨  b^{379, 4}_0
c  in DIMACS:
 24467  24468  24469 -1137 -24470 0
 24467  24468  24469 -1137 -24471 0
 24467  24468  24469 -1137  24472 0

c  1+1 --> 2
c    (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0 ∧  p_1137) -> (-b^{379, 4}_2 ∧  b^{379, 4}_1 ∧ -b^{379, 4}_0)
c  in CNF:
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_2
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨  b^{379, 4}_1
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ -p_1137 ∨ -b^{379, 4}_0
c  in DIMACS:
 24467  24468 -24469 -1137 -24470 0
 24467  24468 -24469 -1137  24471 0
 24467  24468 -24469 -1137 -24472 0

c  2+1 --> break 
c    (-b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧  p_1137) -> break
c  in CNF:
c     b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ -p_1137 ∨ break
c  in DIMACS:
 24467 -24468  24469 -1137 1162 0


c  2-1 --> 1
c    (-b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧ -p_1137) -> (-b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧  b^{379, 4}_0)
c  in CNF:
c     b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_2
c     b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_1
c     b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨  b^{379, 4}_0
c  in DIMACS:
 24467 -24468  24469  1137 -24470 0
 24467 -24468  24469  1137 -24471 0
 24467 -24468  24469  1137  24472 0

c  1-1 --> 0
c    (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0 ∧ -p_1137) -> (-b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧ -b^{379, 4}_0)
c  in CNF:
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_2
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_1
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_0
c  in DIMACS:
 24467  24468 -24469  1137 -24470 0
 24467  24468 -24469  1137 -24471 0
 24467  24468 -24469  1137 -24472 0

c  0-1 --> -1
c    (-b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧ -p_1137) -> ( b^{379, 4}_2 ∧ -b^{379, 4}_1 ∧  b^{379, 4}_0)
c  in CNF:
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨  b^{379, 4}_2
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_1
c     b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨  b^{379, 4}_0
c  in DIMACS:
 24467  24468  24469  1137  24470 0
 24467  24468  24469  1137 -24471 0
 24467  24468  24469  1137  24472 0

c  -1-1 --> -2
c    ( b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧  b^{379, 3}_0 ∧ -p_1137) -> ( b^{379, 4}_2 ∧  b^{379, 4}_1 ∧ -b^{379, 4}_0)
c  in CNF:
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨  b^{379, 4}_2
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨  b^{379, 4}_1
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨  p_1137 ∨ -b^{379, 4}_0
c  in DIMACS:
-24467  24468 -24469  1137  24470 0
-24467  24468 -24469  1137  24471 0
-24467  24468 -24469  1137 -24472 0

c  -2-1 --> break 
c    ( b^{379, 3}_2 ∧  b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧ -p_1137) -> break
c  in CNF:
c    -b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨  b^{379, 3}_0 ∨  p_1137 ∨ break
c  in DIMACS:
-24467 -24468  24469  1137 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{379, 3}_2 ∧ -b^{379, 3}_1 ∧ -b^{379, 3}_0 ∧ true) 
c  in CNF:
c    -b^{379, 3}_2 ∨  b^{379, 3}_1 ∨  b^{379, 3}_0 ∨ false 
c  in DIMACS:
-24467  24468  24469  0

c  3 does not represent an automaton state.
c    -(-b^{379, 3}_2 ∧  b^{379, 3}_1 ∧  b^{379, 3}_0 ∧ true) 
c  in CNF:
c     b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ false 
c  in DIMACS:
 24467 -24468 -24469  0
c  -3 does not represent an automaton state.
c    -( b^{379, 3}_2 ∧  b^{379, 3}_1 ∧  b^{379, 3}_0 ∧ true) 
c  in CNF:
c    -b^{379, 3}_2 ∨ -b^{379, 3}_1 ∨ -b^{379, 3}_0 ∨ false 
c  in DIMACS:
-24467 -24468 -24469  0

c INIT for k = 380
c    -b^{380, 1}_2
c    -b^{380, 1}_1
c    -b^{380, 1}_0
c  in DIMACS:
-24473 0
-24474 0
-24475 0

c Transitions for k = 380
c i = 1
c  -2+1 --> -1
c    ( b^{380, 1}_2 ∧  b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧  p_380) -> ( b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0)
c  in CNF:
c    -b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨  b^{380, 2}_2
c    -b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_1
c    -b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨  b^{380, 2}_0
c  in DIMACS:
-24473 -24474  24475 -380  24476 0
-24473 -24474  24475 -380 -24477 0
-24473 -24474  24475 -380  24478 0

c  -1+1 --> 0
c    ( b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧  b^{380, 1}_0 ∧  p_380) -> (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧ -b^{380, 2}_0)
c  in CNF:
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_2
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_1
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_0
c  in DIMACS:
-24473  24474 -24475 -380 -24476 0
-24473  24474 -24475 -380 -24477 0
-24473  24474 -24475 -380 -24478 0

c  0+1 --> 1
c    (-b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧  p_380) -> (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0)
c  in CNF:
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_2
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_1
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨  b^{380, 2}_0
c  in DIMACS:
 24473  24474  24475 -380 -24476 0
 24473  24474  24475 -380 -24477 0
 24473  24474  24475 -380  24478 0

c  1+1 --> 2
c    (-b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧  b^{380, 1}_0 ∧  p_380) -> (-b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0)
c  in CNF:
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_2
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨  b^{380, 2}_1
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ -p_380 ∨ -b^{380, 2}_0
c  in DIMACS:
 24473  24474 -24475 -380 -24476 0
 24473  24474 -24475 -380  24477 0
 24473  24474 -24475 -380 -24478 0

c  2+1 --> break 
c    (-b^{380, 1}_2 ∧  b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧  p_380) -> break
c  in CNF:
c     b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ -p_380 ∨ break
c  in DIMACS:
 24473 -24474  24475 -380 1162 0


c  2-1 --> 1
c    (-b^{380, 1}_2 ∧  b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧ -p_380) -> (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0)
c  in CNF:
c     b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_2
c     b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_1
c     b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨  b^{380, 2}_0
c  in DIMACS:
 24473 -24474  24475  380 -24476 0
 24473 -24474  24475  380 -24477 0
 24473 -24474  24475  380  24478 0

c  1-1 --> 0
c    (-b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧  b^{380, 1}_0 ∧ -p_380) -> (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧ -b^{380, 2}_0)
c  in CNF:
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_2
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_1
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_0
c  in DIMACS:
 24473  24474 -24475  380 -24476 0
 24473  24474 -24475  380 -24477 0
 24473  24474 -24475  380 -24478 0

c  0-1 --> -1
c    (-b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧ -p_380) -> ( b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0)
c  in CNF:
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨  b^{380, 2}_2
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_1
c     b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨  b^{380, 2}_0
c  in DIMACS:
 24473  24474  24475  380  24476 0
 24473  24474  24475  380 -24477 0
 24473  24474  24475  380  24478 0

c  -1-1 --> -2
c    ( b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧  b^{380, 1}_0 ∧ -p_380) -> ( b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0)
c  in CNF:
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨  b^{380, 2}_2
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨  b^{380, 2}_1
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨  p_380 ∨ -b^{380, 2}_0
c  in DIMACS:
-24473  24474 -24475  380  24476 0
-24473  24474 -24475  380  24477 0
-24473  24474 -24475  380 -24478 0

c  -2-1 --> break 
c    ( b^{380, 1}_2 ∧  b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧ -p_380) -> break
c  in CNF:
c    -b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨  b^{380, 1}_0 ∨  p_380 ∨ break
c  in DIMACS:
-24473 -24474  24475  380 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{380, 1}_2 ∧ -b^{380, 1}_1 ∧ -b^{380, 1}_0 ∧ true) 
c  in CNF:
c    -b^{380, 1}_2 ∨  b^{380, 1}_1 ∨  b^{380, 1}_0 ∨ false 
c  in DIMACS:
-24473  24474  24475  0

c  3 does not represent an automaton state.
c    -(-b^{380, 1}_2 ∧  b^{380, 1}_1 ∧  b^{380, 1}_0 ∧ true) 
c  in CNF:
c     b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ false 
c  in DIMACS:
 24473 -24474 -24475  0
c  -3 does not represent an automaton state.
c    -( b^{380, 1}_2 ∧  b^{380, 1}_1 ∧  b^{380, 1}_0 ∧ true) 
c  in CNF:
c    -b^{380, 1}_2 ∨ -b^{380, 1}_1 ∨ -b^{380, 1}_0 ∨ false 
c  in DIMACS:
-24473 -24474 -24475  0

c i = 2
c  -2+1 --> -1
c    ( b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧  p_760) -> ( b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0)
c  in CNF:
c    -b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨  b^{380, 3}_2
c    -b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_1
c    -b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨  b^{380, 3}_0
c  in DIMACS:
-24476 -24477  24478 -760  24479 0
-24476 -24477  24478 -760 -24480 0
-24476 -24477  24478 -760  24481 0

c  -1+1 --> 0
c    ( b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0 ∧  p_760) -> (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧ -b^{380, 3}_0)
c  in CNF:
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_2
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_1
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_0
c  in DIMACS:
-24476  24477 -24478 -760 -24479 0
-24476  24477 -24478 -760 -24480 0
-24476  24477 -24478 -760 -24481 0

c  0+1 --> 1
c    (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧  p_760) -> (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0)
c  in CNF:
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_2
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_1
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨  b^{380, 3}_0
c  in DIMACS:
 24476  24477  24478 -760 -24479 0
 24476  24477  24478 -760 -24480 0
 24476  24477  24478 -760  24481 0

c  1+1 --> 2
c    (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0 ∧  p_760) -> (-b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0)
c  in CNF:
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_2
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨  b^{380, 3}_1
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ -p_760 ∨ -b^{380, 3}_0
c  in DIMACS:
 24476  24477 -24478 -760 -24479 0
 24476  24477 -24478 -760  24480 0
 24476  24477 -24478 -760 -24481 0

c  2+1 --> break 
c    (-b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧  p_760) -> break
c  in CNF:
c     b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ -p_760 ∨ break
c  in DIMACS:
 24476 -24477  24478 -760 1162 0


c  2-1 --> 1
c    (-b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧ -p_760) -> (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0)
c  in CNF:
c     b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_2
c     b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_1
c     b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨  b^{380, 3}_0
c  in DIMACS:
 24476 -24477  24478  760 -24479 0
 24476 -24477  24478  760 -24480 0
 24476 -24477  24478  760  24481 0

c  1-1 --> 0
c    (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0 ∧ -p_760) -> (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧ -b^{380, 3}_0)
c  in CNF:
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_2
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_1
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_0
c  in DIMACS:
 24476  24477 -24478  760 -24479 0
 24476  24477 -24478  760 -24480 0
 24476  24477 -24478  760 -24481 0

c  0-1 --> -1
c    (-b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧ -p_760) -> ( b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0)
c  in CNF:
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨  b^{380, 3}_2
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_1
c     b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨  b^{380, 3}_0
c  in DIMACS:
 24476  24477  24478  760  24479 0
 24476  24477  24478  760 -24480 0
 24476  24477  24478  760  24481 0

c  -1-1 --> -2
c    ( b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧  b^{380, 2}_0 ∧ -p_760) -> ( b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0)
c  in CNF:
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨  b^{380, 3}_2
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨  b^{380, 3}_1
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨  p_760 ∨ -b^{380, 3}_0
c  in DIMACS:
-24476  24477 -24478  760  24479 0
-24476  24477 -24478  760  24480 0
-24476  24477 -24478  760 -24481 0

c  -2-1 --> break 
c    ( b^{380, 2}_2 ∧  b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧ -p_760) -> break
c  in CNF:
c    -b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨  b^{380, 2}_0 ∨  p_760 ∨ break
c  in DIMACS:
-24476 -24477  24478  760 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{380, 2}_2 ∧ -b^{380, 2}_1 ∧ -b^{380, 2}_0 ∧ true) 
c  in CNF:
c    -b^{380, 2}_2 ∨  b^{380, 2}_1 ∨  b^{380, 2}_0 ∨ false 
c  in DIMACS:
-24476  24477  24478  0

c  3 does not represent an automaton state.
c    -(-b^{380, 2}_2 ∧  b^{380, 2}_1 ∧  b^{380, 2}_0 ∧ true) 
c  in CNF:
c     b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ false 
c  in DIMACS:
 24476 -24477 -24478  0
c  -3 does not represent an automaton state.
c    -( b^{380, 2}_2 ∧  b^{380, 2}_1 ∧  b^{380, 2}_0 ∧ true) 
c  in CNF:
c    -b^{380, 2}_2 ∨ -b^{380, 2}_1 ∨ -b^{380, 2}_0 ∨ false 
c  in DIMACS:
-24476 -24477 -24478  0

c i = 3
c  -2+1 --> -1
c    ( b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧  p_1140) -> ( b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧  b^{380, 4}_0)
c  in CNF:
c    -b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨  b^{380, 4}_2
c    -b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_1
c    -b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨  b^{380, 4}_0
c  in DIMACS:
-24479 -24480  24481 -1140  24482 0
-24479 -24480  24481 -1140 -24483 0
-24479 -24480  24481 -1140  24484 0

c  -1+1 --> 0
c    ( b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0 ∧  p_1140) -> (-b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧ -b^{380, 4}_0)
c  in CNF:
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_2
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_1
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_0
c  in DIMACS:
-24479  24480 -24481 -1140 -24482 0
-24479  24480 -24481 -1140 -24483 0
-24479  24480 -24481 -1140 -24484 0

c  0+1 --> 1
c    (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧  p_1140) -> (-b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧  b^{380, 4}_0)
c  in CNF:
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_2
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_1
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨  b^{380, 4}_0
c  in DIMACS:
 24479  24480  24481 -1140 -24482 0
 24479  24480  24481 -1140 -24483 0
 24479  24480  24481 -1140  24484 0

c  1+1 --> 2
c    (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0 ∧  p_1140) -> (-b^{380, 4}_2 ∧  b^{380, 4}_1 ∧ -b^{380, 4}_0)
c  in CNF:
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_2
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨  b^{380, 4}_1
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ -p_1140 ∨ -b^{380, 4}_0
c  in DIMACS:
 24479  24480 -24481 -1140 -24482 0
 24479  24480 -24481 -1140  24483 0
 24479  24480 -24481 -1140 -24484 0

c  2+1 --> break 
c    (-b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧  p_1140) -> break
c  in CNF:
c     b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ -p_1140 ∨ break
c  in DIMACS:
 24479 -24480  24481 -1140 1162 0


c  2-1 --> 1
c    (-b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧ -p_1140) -> (-b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧  b^{380, 4}_0)
c  in CNF:
c     b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_2
c     b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_1
c     b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨  b^{380, 4}_0
c  in DIMACS:
 24479 -24480  24481  1140 -24482 0
 24479 -24480  24481  1140 -24483 0
 24479 -24480  24481  1140  24484 0

c  1-1 --> 0
c    (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0 ∧ -p_1140) -> (-b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧ -b^{380, 4}_0)
c  in CNF:
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_2
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_1
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_0
c  in DIMACS:
 24479  24480 -24481  1140 -24482 0
 24479  24480 -24481  1140 -24483 0
 24479  24480 -24481  1140 -24484 0

c  0-1 --> -1
c    (-b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧ -p_1140) -> ( b^{380, 4}_2 ∧ -b^{380, 4}_1 ∧  b^{380, 4}_0)
c  in CNF:
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨  b^{380, 4}_2
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_1
c     b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨  b^{380, 4}_0
c  in DIMACS:
 24479  24480  24481  1140  24482 0
 24479  24480  24481  1140 -24483 0
 24479  24480  24481  1140  24484 0

c  -1-1 --> -2
c    ( b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧  b^{380, 3}_0 ∧ -p_1140) -> ( b^{380, 4}_2 ∧  b^{380, 4}_1 ∧ -b^{380, 4}_0)
c  in CNF:
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨  b^{380, 4}_2
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨  b^{380, 4}_1
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨  p_1140 ∨ -b^{380, 4}_0
c  in DIMACS:
-24479  24480 -24481  1140  24482 0
-24479  24480 -24481  1140  24483 0
-24479  24480 -24481  1140 -24484 0

c  -2-1 --> break 
c    ( b^{380, 3}_2 ∧  b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧ -p_1140) -> break
c  in CNF:
c    -b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨  b^{380, 3}_0 ∨  p_1140 ∨ break
c  in DIMACS:
-24479 -24480  24481  1140 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{380, 3}_2 ∧ -b^{380, 3}_1 ∧ -b^{380, 3}_0 ∧ true) 
c  in CNF:
c    -b^{380, 3}_2 ∨  b^{380, 3}_1 ∨  b^{380, 3}_0 ∨ false 
c  in DIMACS:
-24479  24480  24481  0

c  3 does not represent an automaton state.
c    -(-b^{380, 3}_2 ∧  b^{380, 3}_1 ∧  b^{380, 3}_0 ∧ true) 
c  in CNF:
c     b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ false 
c  in DIMACS:
 24479 -24480 -24481  0
c  -3 does not represent an automaton state.
c    -( b^{380, 3}_2 ∧  b^{380, 3}_1 ∧  b^{380, 3}_0 ∧ true) 
c  in CNF:
c    -b^{380, 3}_2 ∨ -b^{380, 3}_1 ∨ -b^{380, 3}_0 ∨ false 
c  in DIMACS:
-24479 -24480 -24481  0

c INIT for k = 381
c    -b^{381, 1}_2
c    -b^{381, 1}_1
c    -b^{381, 1}_0
c  in DIMACS:
-24485 0
-24486 0
-24487 0

c Transitions for k = 381
c i = 1
c  -2+1 --> -1
c    ( b^{381, 1}_2 ∧  b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧  p_381) -> ( b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0)
c  in CNF:
c    -b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨  b^{381, 2}_2
c    -b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_1
c    -b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨  b^{381, 2}_0
c  in DIMACS:
-24485 -24486  24487 -381  24488 0
-24485 -24486  24487 -381 -24489 0
-24485 -24486  24487 -381  24490 0

c  -1+1 --> 0
c    ( b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧  b^{381, 1}_0 ∧  p_381) -> (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧ -b^{381, 2}_0)
c  in CNF:
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_2
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_1
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_0
c  in DIMACS:
-24485  24486 -24487 -381 -24488 0
-24485  24486 -24487 -381 -24489 0
-24485  24486 -24487 -381 -24490 0

c  0+1 --> 1
c    (-b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧  p_381) -> (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0)
c  in CNF:
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_2
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_1
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨  b^{381, 2}_0
c  in DIMACS:
 24485  24486  24487 -381 -24488 0
 24485  24486  24487 -381 -24489 0
 24485  24486  24487 -381  24490 0

c  1+1 --> 2
c    (-b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧  b^{381, 1}_0 ∧  p_381) -> (-b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0)
c  in CNF:
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_2
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨  b^{381, 2}_1
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ -p_381 ∨ -b^{381, 2}_0
c  in DIMACS:
 24485  24486 -24487 -381 -24488 0
 24485  24486 -24487 -381  24489 0
 24485  24486 -24487 -381 -24490 0

c  2+1 --> break 
c    (-b^{381, 1}_2 ∧  b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧  p_381) -> break
c  in CNF:
c     b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ -p_381 ∨ break
c  in DIMACS:
 24485 -24486  24487 -381 1162 0


c  2-1 --> 1
c    (-b^{381, 1}_2 ∧  b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧ -p_381) -> (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0)
c  in CNF:
c     b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_2
c     b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_1
c     b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨  b^{381, 2}_0
c  in DIMACS:
 24485 -24486  24487  381 -24488 0
 24485 -24486  24487  381 -24489 0
 24485 -24486  24487  381  24490 0

c  1-1 --> 0
c    (-b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧  b^{381, 1}_0 ∧ -p_381) -> (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧ -b^{381, 2}_0)
c  in CNF:
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_2
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_1
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_0
c  in DIMACS:
 24485  24486 -24487  381 -24488 0
 24485  24486 -24487  381 -24489 0
 24485  24486 -24487  381 -24490 0

c  0-1 --> -1
c    (-b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧ -p_381) -> ( b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0)
c  in CNF:
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨  b^{381, 2}_2
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_1
c     b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨  b^{381, 2}_0
c  in DIMACS:
 24485  24486  24487  381  24488 0
 24485  24486  24487  381 -24489 0
 24485  24486  24487  381  24490 0

c  -1-1 --> -2
c    ( b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧  b^{381, 1}_0 ∧ -p_381) -> ( b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0)
c  in CNF:
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨  b^{381, 2}_2
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨  b^{381, 2}_1
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨  p_381 ∨ -b^{381, 2}_0
c  in DIMACS:
-24485  24486 -24487  381  24488 0
-24485  24486 -24487  381  24489 0
-24485  24486 -24487  381 -24490 0

c  -2-1 --> break 
c    ( b^{381, 1}_2 ∧  b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧ -p_381) -> break
c  in CNF:
c    -b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨  b^{381, 1}_0 ∨  p_381 ∨ break
c  in DIMACS:
-24485 -24486  24487  381 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{381, 1}_2 ∧ -b^{381, 1}_1 ∧ -b^{381, 1}_0 ∧ true) 
c  in CNF:
c    -b^{381, 1}_2 ∨  b^{381, 1}_1 ∨  b^{381, 1}_0 ∨ false 
c  in DIMACS:
-24485  24486  24487  0

c  3 does not represent an automaton state.
c    -(-b^{381, 1}_2 ∧  b^{381, 1}_1 ∧  b^{381, 1}_0 ∧ true) 
c  in CNF:
c     b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ false 
c  in DIMACS:
 24485 -24486 -24487  0
c  -3 does not represent an automaton state.
c    -( b^{381, 1}_2 ∧  b^{381, 1}_1 ∧  b^{381, 1}_0 ∧ true) 
c  in CNF:
c    -b^{381, 1}_2 ∨ -b^{381, 1}_1 ∨ -b^{381, 1}_0 ∨ false 
c  in DIMACS:
-24485 -24486 -24487  0

c i = 2
c  -2+1 --> -1
c    ( b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧  p_762) -> ( b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0)
c  in CNF:
c    -b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨  b^{381, 3}_2
c    -b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_1
c    -b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨  b^{381, 3}_0
c  in DIMACS:
-24488 -24489  24490 -762  24491 0
-24488 -24489  24490 -762 -24492 0
-24488 -24489  24490 -762  24493 0

c  -1+1 --> 0
c    ( b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0 ∧  p_762) -> (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧ -b^{381, 3}_0)
c  in CNF:
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_2
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_1
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_0
c  in DIMACS:
-24488  24489 -24490 -762 -24491 0
-24488  24489 -24490 -762 -24492 0
-24488  24489 -24490 -762 -24493 0

c  0+1 --> 1
c    (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧  p_762) -> (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0)
c  in CNF:
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_2
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_1
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨  b^{381, 3}_0
c  in DIMACS:
 24488  24489  24490 -762 -24491 0
 24488  24489  24490 -762 -24492 0
 24488  24489  24490 -762  24493 0

c  1+1 --> 2
c    (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0 ∧  p_762) -> (-b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0)
c  in CNF:
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_2
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨  b^{381, 3}_1
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ -p_762 ∨ -b^{381, 3}_0
c  in DIMACS:
 24488  24489 -24490 -762 -24491 0
 24488  24489 -24490 -762  24492 0
 24488  24489 -24490 -762 -24493 0

c  2+1 --> break 
c    (-b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧  p_762) -> break
c  in CNF:
c     b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ -p_762 ∨ break
c  in DIMACS:
 24488 -24489  24490 -762 1162 0


c  2-1 --> 1
c    (-b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧ -p_762) -> (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0)
c  in CNF:
c     b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_2
c     b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_1
c     b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨  b^{381, 3}_0
c  in DIMACS:
 24488 -24489  24490  762 -24491 0
 24488 -24489  24490  762 -24492 0
 24488 -24489  24490  762  24493 0

c  1-1 --> 0
c    (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0 ∧ -p_762) -> (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧ -b^{381, 3}_0)
c  in CNF:
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_2
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_1
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_0
c  in DIMACS:
 24488  24489 -24490  762 -24491 0
 24488  24489 -24490  762 -24492 0
 24488  24489 -24490  762 -24493 0

c  0-1 --> -1
c    (-b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧ -p_762) -> ( b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0)
c  in CNF:
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨  b^{381, 3}_2
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_1
c     b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨  b^{381, 3}_0
c  in DIMACS:
 24488  24489  24490  762  24491 0
 24488  24489  24490  762 -24492 0
 24488  24489  24490  762  24493 0

c  -1-1 --> -2
c    ( b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧  b^{381, 2}_0 ∧ -p_762) -> ( b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0)
c  in CNF:
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨  b^{381, 3}_2
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨  b^{381, 3}_1
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨  p_762 ∨ -b^{381, 3}_0
c  in DIMACS:
-24488  24489 -24490  762  24491 0
-24488  24489 -24490  762  24492 0
-24488  24489 -24490  762 -24493 0

c  -2-1 --> break 
c    ( b^{381, 2}_2 ∧  b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧ -p_762) -> break
c  in CNF:
c    -b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨  b^{381, 2}_0 ∨  p_762 ∨ break
c  in DIMACS:
-24488 -24489  24490  762 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{381, 2}_2 ∧ -b^{381, 2}_1 ∧ -b^{381, 2}_0 ∧ true) 
c  in CNF:
c    -b^{381, 2}_2 ∨  b^{381, 2}_1 ∨  b^{381, 2}_0 ∨ false 
c  in DIMACS:
-24488  24489  24490  0

c  3 does not represent an automaton state.
c    -(-b^{381, 2}_2 ∧  b^{381, 2}_1 ∧  b^{381, 2}_0 ∧ true) 
c  in CNF:
c     b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ false 
c  in DIMACS:
 24488 -24489 -24490  0
c  -3 does not represent an automaton state.
c    -( b^{381, 2}_2 ∧  b^{381, 2}_1 ∧  b^{381, 2}_0 ∧ true) 
c  in CNF:
c    -b^{381, 2}_2 ∨ -b^{381, 2}_1 ∨ -b^{381, 2}_0 ∨ false 
c  in DIMACS:
-24488 -24489 -24490  0

c i = 3
c  -2+1 --> -1
c    ( b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧  p_1143) -> ( b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧  b^{381, 4}_0)
c  in CNF:
c    -b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨  b^{381, 4}_2
c    -b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_1
c    -b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨  b^{381, 4}_0
c  in DIMACS:
-24491 -24492  24493 -1143  24494 0
-24491 -24492  24493 -1143 -24495 0
-24491 -24492  24493 -1143  24496 0

c  -1+1 --> 0
c    ( b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0 ∧  p_1143) -> (-b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧ -b^{381, 4}_0)
c  in CNF:
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_2
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_1
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_0
c  in DIMACS:
-24491  24492 -24493 -1143 -24494 0
-24491  24492 -24493 -1143 -24495 0
-24491  24492 -24493 -1143 -24496 0

c  0+1 --> 1
c    (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧  p_1143) -> (-b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧  b^{381, 4}_0)
c  in CNF:
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_2
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_1
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨  b^{381, 4}_0
c  in DIMACS:
 24491  24492  24493 -1143 -24494 0
 24491  24492  24493 -1143 -24495 0
 24491  24492  24493 -1143  24496 0

c  1+1 --> 2
c    (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0 ∧  p_1143) -> (-b^{381, 4}_2 ∧  b^{381, 4}_1 ∧ -b^{381, 4}_0)
c  in CNF:
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_2
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨  b^{381, 4}_1
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ -p_1143 ∨ -b^{381, 4}_0
c  in DIMACS:
 24491  24492 -24493 -1143 -24494 0
 24491  24492 -24493 -1143  24495 0
 24491  24492 -24493 -1143 -24496 0

c  2+1 --> break 
c    (-b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧  p_1143) -> break
c  in CNF:
c     b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ -p_1143 ∨ break
c  in DIMACS:
 24491 -24492  24493 -1143 1162 0


c  2-1 --> 1
c    (-b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧ -p_1143) -> (-b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧  b^{381, 4}_0)
c  in CNF:
c     b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_2
c     b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_1
c     b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨  b^{381, 4}_0
c  in DIMACS:
 24491 -24492  24493  1143 -24494 0
 24491 -24492  24493  1143 -24495 0
 24491 -24492  24493  1143  24496 0

c  1-1 --> 0
c    (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0 ∧ -p_1143) -> (-b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧ -b^{381, 4}_0)
c  in CNF:
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_2
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_1
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_0
c  in DIMACS:
 24491  24492 -24493  1143 -24494 0
 24491  24492 -24493  1143 -24495 0
 24491  24492 -24493  1143 -24496 0

c  0-1 --> -1
c    (-b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧ -p_1143) -> ( b^{381, 4}_2 ∧ -b^{381, 4}_1 ∧  b^{381, 4}_0)
c  in CNF:
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨  b^{381, 4}_2
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_1
c     b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨  b^{381, 4}_0
c  in DIMACS:
 24491  24492  24493  1143  24494 0
 24491  24492  24493  1143 -24495 0
 24491  24492  24493  1143  24496 0

c  -1-1 --> -2
c    ( b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧  b^{381, 3}_0 ∧ -p_1143) -> ( b^{381, 4}_2 ∧  b^{381, 4}_1 ∧ -b^{381, 4}_0)
c  in CNF:
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨  b^{381, 4}_2
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨  b^{381, 4}_1
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨  p_1143 ∨ -b^{381, 4}_0
c  in DIMACS:
-24491  24492 -24493  1143  24494 0
-24491  24492 -24493  1143  24495 0
-24491  24492 -24493  1143 -24496 0

c  -2-1 --> break 
c    ( b^{381, 3}_2 ∧  b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧ -p_1143) -> break
c  in CNF:
c    -b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨  b^{381, 3}_0 ∨  p_1143 ∨ break
c  in DIMACS:
-24491 -24492  24493  1143 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{381, 3}_2 ∧ -b^{381, 3}_1 ∧ -b^{381, 3}_0 ∧ true) 
c  in CNF:
c    -b^{381, 3}_2 ∨  b^{381, 3}_1 ∨  b^{381, 3}_0 ∨ false 
c  in DIMACS:
-24491  24492  24493  0

c  3 does not represent an automaton state.
c    -(-b^{381, 3}_2 ∧  b^{381, 3}_1 ∧  b^{381, 3}_0 ∧ true) 
c  in CNF:
c     b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ false 
c  in DIMACS:
 24491 -24492 -24493  0
c  -3 does not represent an automaton state.
c    -( b^{381, 3}_2 ∧  b^{381, 3}_1 ∧  b^{381, 3}_0 ∧ true) 
c  in CNF:
c    -b^{381, 3}_2 ∨ -b^{381, 3}_1 ∨ -b^{381, 3}_0 ∨ false 
c  in DIMACS:
-24491 -24492 -24493  0

c INIT for k = 382
c    -b^{382, 1}_2
c    -b^{382, 1}_1
c    -b^{382, 1}_0
c  in DIMACS:
-24497 0
-24498 0
-24499 0

c Transitions for k = 382
c i = 1
c  -2+1 --> -1
c    ( b^{382, 1}_2 ∧  b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧  p_382) -> ( b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0)
c  in CNF:
c    -b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨  b^{382, 2}_2
c    -b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_1
c    -b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨  b^{382, 2}_0
c  in DIMACS:
-24497 -24498  24499 -382  24500 0
-24497 -24498  24499 -382 -24501 0
-24497 -24498  24499 -382  24502 0

c  -1+1 --> 0
c    ( b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧  b^{382, 1}_0 ∧  p_382) -> (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧ -b^{382, 2}_0)
c  in CNF:
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_2
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_1
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_0
c  in DIMACS:
-24497  24498 -24499 -382 -24500 0
-24497  24498 -24499 -382 -24501 0
-24497  24498 -24499 -382 -24502 0

c  0+1 --> 1
c    (-b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧  p_382) -> (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0)
c  in CNF:
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_2
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_1
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨  b^{382, 2}_0
c  in DIMACS:
 24497  24498  24499 -382 -24500 0
 24497  24498  24499 -382 -24501 0
 24497  24498  24499 -382  24502 0

c  1+1 --> 2
c    (-b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧  b^{382, 1}_0 ∧  p_382) -> (-b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0)
c  in CNF:
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_2
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨  b^{382, 2}_1
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ -p_382 ∨ -b^{382, 2}_0
c  in DIMACS:
 24497  24498 -24499 -382 -24500 0
 24497  24498 -24499 -382  24501 0
 24497  24498 -24499 -382 -24502 0

c  2+1 --> break 
c    (-b^{382, 1}_2 ∧  b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧  p_382) -> break
c  in CNF:
c     b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ -p_382 ∨ break
c  in DIMACS:
 24497 -24498  24499 -382 1162 0


c  2-1 --> 1
c    (-b^{382, 1}_2 ∧  b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧ -p_382) -> (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0)
c  in CNF:
c     b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_2
c     b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_1
c     b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨  b^{382, 2}_0
c  in DIMACS:
 24497 -24498  24499  382 -24500 0
 24497 -24498  24499  382 -24501 0
 24497 -24498  24499  382  24502 0

c  1-1 --> 0
c    (-b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧  b^{382, 1}_0 ∧ -p_382) -> (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧ -b^{382, 2}_0)
c  in CNF:
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_2
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_1
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_0
c  in DIMACS:
 24497  24498 -24499  382 -24500 0
 24497  24498 -24499  382 -24501 0
 24497  24498 -24499  382 -24502 0

c  0-1 --> -1
c    (-b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧ -p_382) -> ( b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0)
c  in CNF:
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨  b^{382, 2}_2
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_1
c     b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨  b^{382, 2}_0
c  in DIMACS:
 24497  24498  24499  382  24500 0
 24497  24498  24499  382 -24501 0
 24497  24498  24499  382  24502 0

c  -1-1 --> -2
c    ( b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧  b^{382, 1}_0 ∧ -p_382) -> ( b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0)
c  in CNF:
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨  b^{382, 2}_2
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨  b^{382, 2}_1
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨  p_382 ∨ -b^{382, 2}_0
c  in DIMACS:
-24497  24498 -24499  382  24500 0
-24497  24498 -24499  382  24501 0
-24497  24498 -24499  382 -24502 0

c  -2-1 --> break 
c    ( b^{382, 1}_2 ∧  b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧ -p_382) -> break
c  in CNF:
c    -b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨  b^{382, 1}_0 ∨  p_382 ∨ break
c  in DIMACS:
-24497 -24498  24499  382 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{382, 1}_2 ∧ -b^{382, 1}_1 ∧ -b^{382, 1}_0 ∧ true) 
c  in CNF:
c    -b^{382, 1}_2 ∨  b^{382, 1}_1 ∨  b^{382, 1}_0 ∨ false 
c  in DIMACS:
-24497  24498  24499  0

c  3 does not represent an automaton state.
c    -(-b^{382, 1}_2 ∧  b^{382, 1}_1 ∧  b^{382, 1}_0 ∧ true) 
c  in CNF:
c     b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ false 
c  in DIMACS:
 24497 -24498 -24499  0
c  -3 does not represent an automaton state.
c    -( b^{382, 1}_2 ∧  b^{382, 1}_1 ∧  b^{382, 1}_0 ∧ true) 
c  in CNF:
c    -b^{382, 1}_2 ∨ -b^{382, 1}_1 ∨ -b^{382, 1}_0 ∨ false 
c  in DIMACS:
-24497 -24498 -24499  0

c i = 2
c  -2+1 --> -1
c    ( b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧  p_764) -> ( b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0)
c  in CNF:
c    -b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨  b^{382, 3}_2
c    -b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_1
c    -b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨  b^{382, 3}_0
c  in DIMACS:
-24500 -24501  24502 -764  24503 0
-24500 -24501  24502 -764 -24504 0
-24500 -24501  24502 -764  24505 0

c  -1+1 --> 0
c    ( b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0 ∧  p_764) -> (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧ -b^{382, 3}_0)
c  in CNF:
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_2
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_1
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_0
c  in DIMACS:
-24500  24501 -24502 -764 -24503 0
-24500  24501 -24502 -764 -24504 0
-24500  24501 -24502 -764 -24505 0

c  0+1 --> 1
c    (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧  p_764) -> (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0)
c  in CNF:
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_2
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_1
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨  b^{382, 3}_0
c  in DIMACS:
 24500  24501  24502 -764 -24503 0
 24500  24501  24502 -764 -24504 0
 24500  24501  24502 -764  24505 0

c  1+1 --> 2
c    (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0 ∧  p_764) -> (-b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0)
c  in CNF:
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_2
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨  b^{382, 3}_1
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ -p_764 ∨ -b^{382, 3}_0
c  in DIMACS:
 24500  24501 -24502 -764 -24503 0
 24500  24501 -24502 -764  24504 0
 24500  24501 -24502 -764 -24505 0

c  2+1 --> break 
c    (-b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧  p_764) -> break
c  in CNF:
c     b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ -p_764 ∨ break
c  in DIMACS:
 24500 -24501  24502 -764 1162 0


c  2-1 --> 1
c    (-b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧ -p_764) -> (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0)
c  in CNF:
c     b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_2
c     b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_1
c     b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨  b^{382, 3}_0
c  in DIMACS:
 24500 -24501  24502  764 -24503 0
 24500 -24501  24502  764 -24504 0
 24500 -24501  24502  764  24505 0

c  1-1 --> 0
c    (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0 ∧ -p_764) -> (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧ -b^{382, 3}_0)
c  in CNF:
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_2
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_1
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_0
c  in DIMACS:
 24500  24501 -24502  764 -24503 0
 24500  24501 -24502  764 -24504 0
 24500  24501 -24502  764 -24505 0

c  0-1 --> -1
c    (-b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧ -p_764) -> ( b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0)
c  in CNF:
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨  b^{382, 3}_2
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_1
c     b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨  b^{382, 3}_0
c  in DIMACS:
 24500  24501  24502  764  24503 0
 24500  24501  24502  764 -24504 0
 24500  24501  24502  764  24505 0

c  -1-1 --> -2
c    ( b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧  b^{382, 2}_0 ∧ -p_764) -> ( b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0)
c  in CNF:
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨  b^{382, 3}_2
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨  b^{382, 3}_1
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨  p_764 ∨ -b^{382, 3}_0
c  in DIMACS:
-24500  24501 -24502  764  24503 0
-24500  24501 -24502  764  24504 0
-24500  24501 -24502  764 -24505 0

c  -2-1 --> break 
c    ( b^{382, 2}_2 ∧  b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧ -p_764) -> break
c  in CNF:
c    -b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨  b^{382, 2}_0 ∨  p_764 ∨ break
c  in DIMACS:
-24500 -24501  24502  764 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{382, 2}_2 ∧ -b^{382, 2}_1 ∧ -b^{382, 2}_0 ∧ true) 
c  in CNF:
c    -b^{382, 2}_2 ∨  b^{382, 2}_1 ∨  b^{382, 2}_0 ∨ false 
c  in DIMACS:
-24500  24501  24502  0

c  3 does not represent an automaton state.
c    -(-b^{382, 2}_2 ∧  b^{382, 2}_1 ∧  b^{382, 2}_0 ∧ true) 
c  in CNF:
c     b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ false 
c  in DIMACS:
 24500 -24501 -24502  0
c  -3 does not represent an automaton state.
c    -( b^{382, 2}_2 ∧  b^{382, 2}_1 ∧  b^{382, 2}_0 ∧ true) 
c  in CNF:
c    -b^{382, 2}_2 ∨ -b^{382, 2}_1 ∨ -b^{382, 2}_0 ∨ false 
c  in DIMACS:
-24500 -24501 -24502  0

c i = 3
c  -2+1 --> -1
c    ( b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧  p_1146) -> ( b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧  b^{382, 4}_0)
c  in CNF:
c    -b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨  b^{382, 4}_2
c    -b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_1
c    -b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨  b^{382, 4}_0
c  in DIMACS:
-24503 -24504  24505 -1146  24506 0
-24503 -24504  24505 -1146 -24507 0
-24503 -24504  24505 -1146  24508 0

c  -1+1 --> 0
c    ( b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0 ∧  p_1146) -> (-b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧ -b^{382, 4}_0)
c  in CNF:
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_2
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_1
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_0
c  in DIMACS:
-24503  24504 -24505 -1146 -24506 0
-24503  24504 -24505 -1146 -24507 0
-24503  24504 -24505 -1146 -24508 0

c  0+1 --> 1
c    (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧  p_1146) -> (-b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧  b^{382, 4}_0)
c  in CNF:
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_2
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_1
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨  b^{382, 4}_0
c  in DIMACS:
 24503  24504  24505 -1146 -24506 0
 24503  24504  24505 -1146 -24507 0
 24503  24504  24505 -1146  24508 0

c  1+1 --> 2
c    (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0 ∧  p_1146) -> (-b^{382, 4}_2 ∧  b^{382, 4}_1 ∧ -b^{382, 4}_0)
c  in CNF:
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_2
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨  b^{382, 4}_1
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ -p_1146 ∨ -b^{382, 4}_0
c  in DIMACS:
 24503  24504 -24505 -1146 -24506 0
 24503  24504 -24505 -1146  24507 0
 24503  24504 -24505 -1146 -24508 0

c  2+1 --> break 
c    (-b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧  p_1146) -> break
c  in CNF:
c     b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ -p_1146 ∨ break
c  in DIMACS:
 24503 -24504  24505 -1146 1162 0


c  2-1 --> 1
c    (-b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧ -p_1146) -> (-b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧  b^{382, 4}_0)
c  in CNF:
c     b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_2
c     b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_1
c     b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨  b^{382, 4}_0
c  in DIMACS:
 24503 -24504  24505  1146 -24506 0
 24503 -24504  24505  1146 -24507 0
 24503 -24504  24505  1146  24508 0

c  1-1 --> 0
c    (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0 ∧ -p_1146) -> (-b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧ -b^{382, 4}_0)
c  in CNF:
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_2
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_1
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_0
c  in DIMACS:
 24503  24504 -24505  1146 -24506 0
 24503  24504 -24505  1146 -24507 0
 24503  24504 -24505  1146 -24508 0

c  0-1 --> -1
c    (-b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧ -p_1146) -> ( b^{382, 4}_2 ∧ -b^{382, 4}_1 ∧  b^{382, 4}_0)
c  in CNF:
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨  b^{382, 4}_2
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_1
c     b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨  b^{382, 4}_0
c  in DIMACS:
 24503  24504  24505  1146  24506 0
 24503  24504  24505  1146 -24507 0
 24503  24504  24505  1146  24508 0

c  -1-1 --> -2
c    ( b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧  b^{382, 3}_0 ∧ -p_1146) -> ( b^{382, 4}_2 ∧  b^{382, 4}_1 ∧ -b^{382, 4}_0)
c  in CNF:
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨  b^{382, 4}_2
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨  b^{382, 4}_1
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨  p_1146 ∨ -b^{382, 4}_0
c  in DIMACS:
-24503  24504 -24505  1146  24506 0
-24503  24504 -24505  1146  24507 0
-24503  24504 -24505  1146 -24508 0

c  -2-1 --> break 
c    ( b^{382, 3}_2 ∧  b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧ -p_1146) -> break
c  in CNF:
c    -b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨  b^{382, 3}_0 ∨  p_1146 ∨ break
c  in DIMACS:
-24503 -24504  24505  1146 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{382, 3}_2 ∧ -b^{382, 3}_1 ∧ -b^{382, 3}_0 ∧ true) 
c  in CNF:
c    -b^{382, 3}_2 ∨  b^{382, 3}_1 ∨  b^{382, 3}_0 ∨ false 
c  in DIMACS:
-24503  24504  24505  0

c  3 does not represent an automaton state.
c    -(-b^{382, 3}_2 ∧  b^{382, 3}_1 ∧  b^{382, 3}_0 ∧ true) 
c  in CNF:
c     b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ false 
c  in DIMACS:
 24503 -24504 -24505  0
c  -3 does not represent an automaton state.
c    -( b^{382, 3}_2 ∧  b^{382, 3}_1 ∧  b^{382, 3}_0 ∧ true) 
c  in CNF:
c    -b^{382, 3}_2 ∨ -b^{382, 3}_1 ∨ -b^{382, 3}_0 ∨ false 
c  in DIMACS:
-24503 -24504 -24505  0

c INIT for k = 383
c    -b^{383, 1}_2
c    -b^{383, 1}_1
c    -b^{383, 1}_0
c  in DIMACS:
-24509 0
-24510 0
-24511 0

c Transitions for k = 383
c i = 1
c  -2+1 --> -1
c    ( b^{383, 1}_2 ∧  b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧  p_383) -> ( b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0)
c  in CNF:
c    -b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨  b^{383, 2}_2
c    -b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_1
c    -b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨  b^{383, 2}_0
c  in DIMACS:
-24509 -24510  24511 -383  24512 0
-24509 -24510  24511 -383 -24513 0
-24509 -24510  24511 -383  24514 0

c  -1+1 --> 0
c    ( b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧  b^{383, 1}_0 ∧  p_383) -> (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧ -b^{383, 2}_0)
c  in CNF:
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_2
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_1
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_0
c  in DIMACS:
-24509  24510 -24511 -383 -24512 0
-24509  24510 -24511 -383 -24513 0
-24509  24510 -24511 -383 -24514 0

c  0+1 --> 1
c    (-b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧  p_383) -> (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0)
c  in CNF:
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_2
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_1
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨  b^{383, 2}_0
c  in DIMACS:
 24509  24510  24511 -383 -24512 0
 24509  24510  24511 -383 -24513 0
 24509  24510  24511 -383  24514 0

c  1+1 --> 2
c    (-b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧  b^{383, 1}_0 ∧  p_383) -> (-b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0)
c  in CNF:
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_2
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨  b^{383, 2}_1
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ -p_383 ∨ -b^{383, 2}_0
c  in DIMACS:
 24509  24510 -24511 -383 -24512 0
 24509  24510 -24511 -383  24513 0
 24509  24510 -24511 -383 -24514 0

c  2+1 --> break 
c    (-b^{383, 1}_2 ∧  b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧  p_383) -> break
c  in CNF:
c     b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ -p_383 ∨ break
c  in DIMACS:
 24509 -24510  24511 -383 1162 0


c  2-1 --> 1
c    (-b^{383, 1}_2 ∧  b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧ -p_383) -> (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0)
c  in CNF:
c     b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_2
c     b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_1
c     b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨  b^{383, 2}_0
c  in DIMACS:
 24509 -24510  24511  383 -24512 0
 24509 -24510  24511  383 -24513 0
 24509 -24510  24511  383  24514 0

c  1-1 --> 0
c    (-b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧  b^{383, 1}_0 ∧ -p_383) -> (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧ -b^{383, 2}_0)
c  in CNF:
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_2
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_1
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_0
c  in DIMACS:
 24509  24510 -24511  383 -24512 0
 24509  24510 -24511  383 -24513 0
 24509  24510 -24511  383 -24514 0

c  0-1 --> -1
c    (-b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧ -p_383) -> ( b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0)
c  in CNF:
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨  b^{383, 2}_2
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_1
c     b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨  b^{383, 2}_0
c  in DIMACS:
 24509  24510  24511  383  24512 0
 24509  24510  24511  383 -24513 0
 24509  24510  24511  383  24514 0

c  -1-1 --> -2
c    ( b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧  b^{383, 1}_0 ∧ -p_383) -> ( b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0)
c  in CNF:
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨  b^{383, 2}_2
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨  b^{383, 2}_1
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨  p_383 ∨ -b^{383, 2}_0
c  in DIMACS:
-24509  24510 -24511  383  24512 0
-24509  24510 -24511  383  24513 0
-24509  24510 -24511  383 -24514 0

c  -2-1 --> break 
c    ( b^{383, 1}_2 ∧  b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧ -p_383) -> break
c  in CNF:
c    -b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨  b^{383, 1}_0 ∨  p_383 ∨ break
c  in DIMACS:
-24509 -24510  24511  383 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{383, 1}_2 ∧ -b^{383, 1}_1 ∧ -b^{383, 1}_0 ∧ true) 
c  in CNF:
c    -b^{383, 1}_2 ∨  b^{383, 1}_1 ∨  b^{383, 1}_0 ∨ false 
c  in DIMACS:
-24509  24510  24511  0

c  3 does not represent an automaton state.
c    -(-b^{383, 1}_2 ∧  b^{383, 1}_1 ∧  b^{383, 1}_0 ∧ true) 
c  in CNF:
c     b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ false 
c  in DIMACS:
 24509 -24510 -24511  0
c  -3 does not represent an automaton state.
c    -( b^{383, 1}_2 ∧  b^{383, 1}_1 ∧  b^{383, 1}_0 ∧ true) 
c  in CNF:
c    -b^{383, 1}_2 ∨ -b^{383, 1}_1 ∨ -b^{383, 1}_0 ∨ false 
c  in DIMACS:
-24509 -24510 -24511  0

c i = 2
c  -2+1 --> -1
c    ( b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧  p_766) -> ( b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0)
c  in CNF:
c    -b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨  b^{383, 3}_2
c    -b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_1
c    -b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨  b^{383, 3}_0
c  in DIMACS:
-24512 -24513  24514 -766  24515 0
-24512 -24513  24514 -766 -24516 0
-24512 -24513  24514 -766  24517 0

c  -1+1 --> 0
c    ( b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0 ∧  p_766) -> (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧ -b^{383, 3}_0)
c  in CNF:
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_2
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_1
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_0
c  in DIMACS:
-24512  24513 -24514 -766 -24515 0
-24512  24513 -24514 -766 -24516 0
-24512  24513 -24514 -766 -24517 0

c  0+1 --> 1
c    (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧  p_766) -> (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0)
c  in CNF:
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_2
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_1
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨  b^{383, 3}_0
c  in DIMACS:
 24512  24513  24514 -766 -24515 0
 24512  24513  24514 -766 -24516 0
 24512  24513  24514 -766  24517 0

c  1+1 --> 2
c    (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0 ∧  p_766) -> (-b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0)
c  in CNF:
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_2
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨  b^{383, 3}_1
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ -p_766 ∨ -b^{383, 3}_0
c  in DIMACS:
 24512  24513 -24514 -766 -24515 0
 24512  24513 -24514 -766  24516 0
 24512  24513 -24514 -766 -24517 0

c  2+1 --> break 
c    (-b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧  p_766) -> break
c  in CNF:
c     b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ -p_766 ∨ break
c  in DIMACS:
 24512 -24513  24514 -766 1162 0


c  2-1 --> 1
c    (-b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧ -p_766) -> (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0)
c  in CNF:
c     b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_2
c     b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_1
c     b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨  b^{383, 3}_0
c  in DIMACS:
 24512 -24513  24514  766 -24515 0
 24512 -24513  24514  766 -24516 0
 24512 -24513  24514  766  24517 0

c  1-1 --> 0
c    (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0 ∧ -p_766) -> (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧ -b^{383, 3}_0)
c  in CNF:
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_2
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_1
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_0
c  in DIMACS:
 24512  24513 -24514  766 -24515 0
 24512  24513 -24514  766 -24516 0
 24512  24513 -24514  766 -24517 0

c  0-1 --> -1
c    (-b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧ -p_766) -> ( b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0)
c  in CNF:
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨  b^{383, 3}_2
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_1
c     b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨  b^{383, 3}_0
c  in DIMACS:
 24512  24513  24514  766  24515 0
 24512  24513  24514  766 -24516 0
 24512  24513  24514  766  24517 0

c  -1-1 --> -2
c    ( b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧  b^{383, 2}_0 ∧ -p_766) -> ( b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0)
c  in CNF:
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨  b^{383, 3}_2
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨  b^{383, 3}_1
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨  p_766 ∨ -b^{383, 3}_0
c  in DIMACS:
-24512  24513 -24514  766  24515 0
-24512  24513 -24514  766  24516 0
-24512  24513 -24514  766 -24517 0

c  -2-1 --> break 
c    ( b^{383, 2}_2 ∧  b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧ -p_766) -> break
c  in CNF:
c    -b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨  b^{383, 2}_0 ∨  p_766 ∨ break
c  in DIMACS:
-24512 -24513  24514  766 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{383, 2}_2 ∧ -b^{383, 2}_1 ∧ -b^{383, 2}_0 ∧ true) 
c  in CNF:
c    -b^{383, 2}_2 ∨  b^{383, 2}_1 ∨  b^{383, 2}_0 ∨ false 
c  in DIMACS:
-24512  24513  24514  0

c  3 does not represent an automaton state.
c    -(-b^{383, 2}_2 ∧  b^{383, 2}_1 ∧  b^{383, 2}_0 ∧ true) 
c  in CNF:
c     b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ false 
c  in DIMACS:
 24512 -24513 -24514  0
c  -3 does not represent an automaton state.
c    -( b^{383, 2}_2 ∧  b^{383, 2}_1 ∧  b^{383, 2}_0 ∧ true) 
c  in CNF:
c    -b^{383, 2}_2 ∨ -b^{383, 2}_1 ∨ -b^{383, 2}_0 ∨ false 
c  in DIMACS:
-24512 -24513 -24514  0

c i = 3
c  -2+1 --> -1
c    ( b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧  p_1149) -> ( b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧  b^{383, 4}_0)
c  in CNF:
c    -b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨  b^{383, 4}_2
c    -b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_1
c    -b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨  b^{383, 4}_0
c  in DIMACS:
-24515 -24516  24517 -1149  24518 0
-24515 -24516  24517 -1149 -24519 0
-24515 -24516  24517 -1149  24520 0

c  -1+1 --> 0
c    ( b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0 ∧  p_1149) -> (-b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧ -b^{383, 4}_0)
c  in CNF:
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_2
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_1
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_0
c  in DIMACS:
-24515  24516 -24517 -1149 -24518 0
-24515  24516 -24517 -1149 -24519 0
-24515  24516 -24517 -1149 -24520 0

c  0+1 --> 1
c    (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧  p_1149) -> (-b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧  b^{383, 4}_0)
c  in CNF:
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_2
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_1
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨  b^{383, 4}_0
c  in DIMACS:
 24515  24516  24517 -1149 -24518 0
 24515  24516  24517 -1149 -24519 0
 24515  24516  24517 -1149  24520 0

c  1+1 --> 2
c    (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0 ∧  p_1149) -> (-b^{383, 4}_2 ∧  b^{383, 4}_1 ∧ -b^{383, 4}_0)
c  in CNF:
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_2
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨  b^{383, 4}_1
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ -p_1149 ∨ -b^{383, 4}_0
c  in DIMACS:
 24515  24516 -24517 -1149 -24518 0
 24515  24516 -24517 -1149  24519 0
 24515  24516 -24517 -1149 -24520 0

c  2+1 --> break 
c    (-b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧  p_1149) -> break
c  in CNF:
c     b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ -p_1149 ∨ break
c  in DIMACS:
 24515 -24516  24517 -1149 1162 0


c  2-1 --> 1
c    (-b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧ -p_1149) -> (-b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧  b^{383, 4}_0)
c  in CNF:
c     b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_2
c     b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_1
c     b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨  b^{383, 4}_0
c  in DIMACS:
 24515 -24516  24517  1149 -24518 0
 24515 -24516  24517  1149 -24519 0
 24515 -24516  24517  1149  24520 0

c  1-1 --> 0
c    (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0 ∧ -p_1149) -> (-b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧ -b^{383, 4}_0)
c  in CNF:
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_2
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_1
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_0
c  in DIMACS:
 24515  24516 -24517  1149 -24518 0
 24515  24516 -24517  1149 -24519 0
 24515  24516 -24517  1149 -24520 0

c  0-1 --> -1
c    (-b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧ -p_1149) -> ( b^{383, 4}_2 ∧ -b^{383, 4}_1 ∧  b^{383, 4}_0)
c  in CNF:
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨  b^{383, 4}_2
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_1
c     b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨  b^{383, 4}_0
c  in DIMACS:
 24515  24516  24517  1149  24518 0
 24515  24516  24517  1149 -24519 0
 24515  24516  24517  1149  24520 0

c  -1-1 --> -2
c    ( b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧  b^{383, 3}_0 ∧ -p_1149) -> ( b^{383, 4}_2 ∧  b^{383, 4}_1 ∧ -b^{383, 4}_0)
c  in CNF:
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨  b^{383, 4}_2
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨  b^{383, 4}_1
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨  p_1149 ∨ -b^{383, 4}_0
c  in DIMACS:
-24515  24516 -24517  1149  24518 0
-24515  24516 -24517  1149  24519 0
-24515  24516 -24517  1149 -24520 0

c  -2-1 --> break 
c    ( b^{383, 3}_2 ∧  b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧ -p_1149) -> break
c  in CNF:
c    -b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨  b^{383, 3}_0 ∨  p_1149 ∨ break
c  in DIMACS:
-24515 -24516  24517  1149 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{383, 3}_2 ∧ -b^{383, 3}_1 ∧ -b^{383, 3}_0 ∧ true) 
c  in CNF:
c    -b^{383, 3}_2 ∨  b^{383, 3}_1 ∨  b^{383, 3}_0 ∨ false 
c  in DIMACS:
-24515  24516  24517  0

c  3 does not represent an automaton state.
c    -(-b^{383, 3}_2 ∧  b^{383, 3}_1 ∧  b^{383, 3}_0 ∧ true) 
c  in CNF:
c     b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ false 
c  in DIMACS:
 24515 -24516 -24517  0
c  -3 does not represent an automaton state.
c    -( b^{383, 3}_2 ∧  b^{383, 3}_1 ∧  b^{383, 3}_0 ∧ true) 
c  in CNF:
c    -b^{383, 3}_2 ∨ -b^{383, 3}_1 ∨ -b^{383, 3}_0 ∨ false 
c  in DIMACS:
-24515 -24516 -24517  0

c INIT for k = 384
c    -b^{384, 1}_2
c    -b^{384, 1}_1
c    -b^{384, 1}_0
c  in DIMACS:
-24521 0
-24522 0
-24523 0

c Transitions for k = 384
c i = 1
c  -2+1 --> -1
c    ( b^{384, 1}_2 ∧  b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧  p_384) -> ( b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0)
c  in CNF:
c    -b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨  b^{384, 2}_2
c    -b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_1
c    -b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨  b^{384, 2}_0
c  in DIMACS:
-24521 -24522  24523 -384  24524 0
-24521 -24522  24523 -384 -24525 0
-24521 -24522  24523 -384  24526 0

c  -1+1 --> 0
c    ( b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧  b^{384, 1}_0 ∧  p_384) -> (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧ -b^{384, 2}_0)
c  in CNF:
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_2
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_1
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_0
c  in DIMACS:
-24521  24522 -24523 -384 -24524 0
-24521  24522 -24523 -384 -24525 0
-24521  24522 -24523 -384 -24526 0

c  0+1 --> 1
c    (-b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧  p_384) -> (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0)
c  in CNF:
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_2
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_1
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨  b^{384, 2}_0
c  in DIMACS:
 24521  24522  24523 -384 -24524 0
 24521  24522  24523 -384 -24525 0
 24521  24522  24523 -384  24526 0

c  1+1 --> 2
c    (-b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧  b^{384, 1}_0 ∧  p_384) -> (-b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0)
c  in CNF:
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_2
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨  b^{384, 2}_1
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ -p_384 ∨ -b^{384, 2}_0
c  in DIMACS:
 24521  24522 -24523 -384 -24524 0
 24521  24522 -24523 -384  24525 0
 24521  24522 -24523 -384 -24526 0

c  2+1 --> break 
c    (-b^{384, 1}_2 ∧  b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧  p_384) -> break
c  in CNF:
c     b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ -p_384 ∨ break
c  in DIMACS:
 24521 -24522  24523 -384 1162 0


c  2-1 --> 1
c    (-b^{384, 1}_2 ∧  b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧ -p_384) -> (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0)
c  in CNF:
c     b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_2
c     b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_1
c     b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨  b^{384, 2}_0
c  in DIMACS:
 24521 -24522  24523  384 -24524 0
 24521 -24522  24523  384 -24525 0
 24521 -24522  24523  384  24526 0

c  1-1 --> 0
c    (-b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧  b^{384, 1}_0 ∧ -p_384) -> (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧ -b^{384, 2}_0)
c  in CNF:
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_2
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_1
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_0
c  in DIMACS:
 24521  24522 -24523  384 -24524 0
 24521  24522 -24523  384 -24525 0
 24521  24522 -24523  384 -24526 0

c  0-1 --> -1
c    (-b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧ -p_384) -> ( b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0)
c  in CNF:
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨  b^{384, 2}_2
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_1
c     b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨  b^{384, 2}_0
c  in DIMACS:
 24521  24522  24523  384  24524 0
 24521  24522  24523  384 -24525 0
 24521  24522  24523  384  24526 0

c  -1-1 --> -2
c    ( b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧  b^{384, 1}_0 ∧ -p_384) -> ( b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0)
c  in CNF:
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨  b^{384, 2}_2
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨  b^{384, 2}_1
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨  p_384 ∨ -b^{384, 2}_0
c  in DIMACS:
-24521  24522 -24523  384  24524 0
-24521  24522 -24523  384  24525 0
-24521  24522 -24523  384 -24526 0

c  -2-1 --> break 
c    ( b^{384, 1}_2 ∧  b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧ -p_384) -> break
c  in CNF:
c    -b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨  b^{384, 1}_0 ∨  p_384 ∨ break
c  in DIMACS:
-24521 -24522  24523  384 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{384, 1}_2 ∧ -b^{384, 1}_1 ∧ -b^{384, 1}_0 ∧ true) 
c  in CNF:
c    -b^{384, 1}_2 ∨  b^{384, 1}_1 ∨  b^{384, 1}_0 ∨ false 
c  in DIMACS:
-24521  24522  24523  0

c  3 does not represent an automaton state.
c    -(-b^{384, 1}_2 ∧  b^{384, 1}_1 ∧  b^{384, 1}_0 ∧ true) 
c  in CNF:
c     b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ false 
c  in DIMACS:
 24521 -24522 -24523  0
c  -3 does not represent an automaton state.
c    -( b^{384, 1}_2 ∧  b^{384, 1}_1 ∧  b^{384, 1}_0 ∧ true) 
c  in CNF:
c    -b^{384, 1}_2 ∨ -b^{384, 1}_1 ∨ -b^{384, 1}_0 ∨ false 
c  in DIMACS:
-24521 -24522 -24523  0

c i = 2
c  -2+1 --> -1
c    ( b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧  p_768) -> ( b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0)
c  in CNF:
c    -b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨  b^{384, 3}_2
c    -b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_1
c    -b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨  b^{384, 3}_0
c  in DIMACS:
-24524 -24525  24526 -768  24527 0
-24524 -24525  24526 -768 -24528 0
-24524 -24525  24526 -768  24529 0

c  -1+1 --> 0
c    ( b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0 ∧  p_768) -> (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧ -b^{384, 3}_0)
c  in CNF:
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_2
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_1
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_0
c  in DIMACS:
-24524  24525 -24526 -768 -24527 0
-24524  24525 -24526 -768 -24528 0
-24524  24525 -24526 -768 -24529 0

c  0+1 --> 1
c    (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧  p_768) -> (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0)
c  in CNF:
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_2
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_1
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨  b^{384, 3}_0
c  in DIMACS:
 24524  24525  24526 -768 -24527 0
 24524  24525  24526 -768 -24528 0
 24524  24525  24526 -768  24529 0

c  1+1 --> 2
c    (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0 ∧  p_768) -> (-b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0)
c  in CNF:
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_2
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨  b^{384, 3}_1
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ -p_768 ∨ -b^{384, 3}_0
c  in DIMACS:
 24524  24525 -24526 -768 -24527 0
 24524  24525 -24526 -768  24528 0
 24524  24525 -24526 -768 -24529 0

c  2+1 --> break 
c    (-b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧  p_768) -> break
c  in CNF:
c     b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ -p_768 ∨ break
c  in DIMACS:
 24524 -24525  24526 -768 1162 0


c  2-1 --> 1
c    (-b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧ -p_768) -> (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0)
c  in CNF:
c     b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_2
c     b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_1
c     b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨  b^{384, 3}_0
c  in DIMACS:
 24524 -24525  24526  768 -24527 0
 24524 -24525  24526  768 -24528 0
 24524 -24525  24526  768  24529 0

c  1-1 --> 0
c    (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0 ∧ -p_768) -> (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧ -b^{384, 3}_0)
c  in CNF:
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_2
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_1
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_0
c  in DIMACS:
 24524  24525 -24526  768 -24527 0
 24524  24525 -24526  768 -24528 0
 24524  24525 -24526  768 -24529 0

c  0-1 --> -1
c    (-b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧ -p_768) -> ( b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0)
c  in CNF:
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨  b^{384, 3}_2
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_1
c     b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨  b^{384, 3}_0
c  in DIMACS:
 24524  24525  24526  768  24527 0
 24524  24525  24526  768 -24528 0
 24524  24525  24526  768  24529 0

c  -1-1 --> -2
c    ( b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧  b^{384, 2}_0 ∧ -p_768) -> ( b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0)
c  in CNF:
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨  b^{384, 3}_2
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨  b^{384, 3}_1
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨  p_768 ∨ -b^{384, 3}_0
c  in DIMACS:
-24524  24525 -24526  768  24527 0
-24524  24525 -24526  768  24528 0
-24524  24525 -24526  768 -24529 0

c  -2-1 --> break 
c    ( b^{384, 2}_2 ∧  b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧ -p_768) -> break
c  in CNF:
c    -b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨  b^{384, 2}_0 ∨  p_768 ∨ break
c  in DIMACS:
-24524 -24525  24526  768 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{384, 2}_2 ∧ -b^{384, 2}_1 ∧ -b^{384, 2}_0 ∧ true) 
c  in CNF:
c    -b^{384, 2}_2 ∨  b^{384, 2}_1 ∨  b^{384, 2}_0 ∨ false 
c  in DIMACS:
-24524  24525  24526  0

c  3 does not represent an automaton state.
c    -(-b^{384, 2}_2 ∧  b^{384, 2}_1 ∧  b^{384, 2}_0 ∧ true) 
c  in CNF:
c     b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ false 
c  in DIMACS:
 24524 -24525 -24526  0
c  -3 does not represent an automaton state.
c    -( b^{384, 2}_2 ∧  b^{384, 2}_1 ∧  b^{384, 2}_0 ∧ true) 
c  in CNF:
c    -b^{384, 2}_2 ∨ -b^{384, 2}_1 ∨ -b^{384, 2}_0 ∨ false 
c  in DIMACS:
-24524 -24525 -24526  0

c i = 3
c  -2+1 --> -1
c    ( b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧  p_1152) -> ( b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧  b^{384, 4}_0)
c  in CNF:
c    -b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨  b^{384, 4}_2
c    -b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_1
c    -b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨  b^{384, 4}_0
c  in DIMACS:
-24527 -24528  24529 -1152  24530 0
-24527 -24528  24529 -1152 -24531 0
-24527 -24528  24529 -1152  24532 0

c  -1+1 --> 0
c    ( b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0 ∧  p_1152) -> (-b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧ -b^{384, 4}_0)
c  in CNF:
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_2
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_1
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_0
c  in DIMACS:
-24527  24528 -24529 -1152 -24530 0
-24527  24528 -24529 -1152 -24531 0
-24527  24528 -24529 -1152 -24532 0

c  0+1 --> 1
c    (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧  p_1152) -> (-b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧  b^{384, 4}_0)
c  in CNF:
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_2
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_1
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨  b^{384, 4}_0
c  in DIMACS:
 24527  24528  24529 -1152 -24530 0
 24527  24528  24529 -1152 -24531 0
 24527  24528  24529 -1152  24532 0

c  1+1 --> 2
c    (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0 ∧  p_1152) -> (-b^{384, 4}_2 ∧  b^{384, 4}_1 ∧ -b^{384, 4}_0)
c  in CNF:
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_2
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨  b^{384, 4}_1
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ -p_1152 ∨ -b^{384, 4}_0
c  in DIMACS:
 24527  24528 -24529 -1152 -24530 0
 24527  24528 -24529 -1152  24531 0
 24527  24528 -24529 -1152 -24532 0

c  2+1 --> break 
c    (-b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧  p_1152) -> break
c  in CNF:
c     b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ -p_1152 ∨ break
c  in DIMACS:
 24527 -24528  24529 -1152 1162 0


c  2-1 --> 1
c    (-b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧ -p_1152) -> (-b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧  b^{384, 4}_0)
c  in CNF:
c     b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_2
c     b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_1
c     b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨  b^{384, 4}_0
c  in DIMACS:
 24527 -24528  24529  1152 -24530 0
 24527 -24528  24529  1152 -24531 0
 24527 -24528  24529  1152  24532 0

c  1-1 --> 0
c    (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0 ∧ -p_1152) -> (-b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧ -b^{384, 4}_0)
c  in CNF:
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_2
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_1
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_0
c  in DIMACS:
 24527  24528 -24529  1152 -24530 0
 24527  24528 -24529  1152 -24531 0
 24527  24528 -24529  1152 -24532 0

c  0-1 --> -1
c    (-b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧ -p_1152) -> ( b^{384, 4}_2 ∧ -b^{384, 4}_1 ∧  b^{384, 4}_0)
c  in CNF:
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨  b^{384, 4}_2
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_1
c     b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨  b^{384, 4}_0
c  in DIMACS:
 24527  24528  24529  1152  24530 0
 24527  24528  24529  1152 -24531 0
 24527  24528  24529  1152  24532 0

c  -1-1 --> -2
c    ( b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧  b^{384, 3}_0 ∧ -p_1152) -> ( b^{384, 4}_2 ∧  b^{384, 4}_1 ∧ -b^{384, 4}_0)
c  in CNF:
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨  b^{384, 4}_2
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨  b^{384, 4}_1
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨  p_1152 ∨ -b^{384, 4}_0
c  in DIMACS:
-24527  24528 -24529  1152  24530 0
-24527  24528 -24529  1152  24531 0
-24527  24528 -24529  1152 -24532 0

c  -2-1 --> break 
c    ( b^{384, 3}_2 ∧  b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧ -p_1152) -> break
c  in CNF:
c    -b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨  b^{384, 3}_0 ∨  p_1152 ∨ break
c  in DIMACS:
-24527 -24528  24529  1152 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{384, 3}_2 ∧ -b^{384, 3}_1 ∧ -b^{384, 3}_0 ∧ true) 
c  in CNF:
c    -b^{384, 3}_2 ∨  b^{384, 3}_1 ∨  b^{384, 3}_0 ∨ false 
c  in DIMACS:
-24527  24528  24529  0

c  3 does not represent an automaton state.
c    -(-b^{384, 3}_2 ∧  b^{384, 3}_1 ∧  b^{384, 3}_0 ∧ true) 
c  in CNF:
c     b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ false 
c  in DIMACS:
 24527 -24528 -24529  0
c  -3 does not represent an automaton state.
c    -( b^{384, 3}_2 ∧  b^{384, 3}_1 ∧  b^{384, 3}_0 ∧ true) 
c  in CNF:
c    -b^{384, 3}_2 ∨ -b^{384, 3}_1 ∨ -b^{384, 3}_0 ∨ false 
c  in DIMACS:
-24527 -24528 -24529  0

c INIT for k = 385
c    -b^{385, 1}_2
c    -b^{385, 1}_1
c    -b^{385, 1}_0
c  in DIMACS:
-24533 0
-24534 0
-24535 0

c Transitions for k = 385
c i = 1
c  -2+1 --> -1
c    ( b^{385, 1}_2 ∧  b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧  p_385) -> ( b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0)
c  in CNF:
c    -b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨  b^{385, 2}_2
c    -b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_1
c    -b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨  b^{385, 2}_0
c  in DIMACS:
-24533 -24534  24535 -385  24536 0
-24533 -24534  24535 -385 -24537 0
-24533 -24534  24535 -385  24538 0

c  -1+1 --> 0
c    ( b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧  b^{385, 1}_0 ∧  p_385) -> (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧ -b^{385, 2}_0)
c  in CNF:
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_2
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_1
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_0
c  in DIMACS:
-24533  24534 -24535 -385 -24536 0
-24533  24534 -24535 -385 -24537 0
-24533  24534 -24535 -385 -24538 0

c  0+1 --> 1
c    (-b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧  p_385) -> (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0)
c  in CNF:
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_2
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_1
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨  b^{385, 2}_0
c  in DIMACS:
 24533  24534  24535 -385 -24536 0
 24533  24534  24535 -385 -24537 0
 24533  24534  24535 -385  24538 0

c  1+1 --> 2
c    (-b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧  b^{385, 1}_0 ∧  p_385) -> (-b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0)
c  in CNF:
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_2
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨  b^{385, 2}_1
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ -p_385 ∨ -b^{385, 2}_0
c  in DIMACS:
 24533  24534 -24535 -385 -24536 0
 24533  24534 -24535 -385  24537 0
 24533  24534 -24535 -385 -24538 0

c  2+1 --> break 
c    (-b^{385, 1}_2 ∧  b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧  p_385) -> break
c  in CNF:
c     b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ -p_385 ∨ break
c  in DIMACS:
 24533 -24534  24535 -385 1162 0


c  2-1 --> 1
c    (-b^{385, 1}_2 ∧  b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧ -p_385) -> (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0)
c  in CNF:
c     b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_2
c     b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_1
c     b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨  b^{385, 2}_0
c  in DIMACS:
 24533 -24534  24535  385 -24536 0
 24533 -24534  24535  385 -24537 0
 24533 -24534  24535  385  24538 0

c  1-1 --> 0
c    (-b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧  b^{385, 1}_0 ∧ -p_385) -> (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧ -b^{385, 2}_0)
c  in CNF:
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_2
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_1
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_0
c  in DIMACS:
 24533  24534 -24535  385 -24536 0
 24533  24534 -24535  385 -24537 0
 24533  24534 -24535  385 -24538 0

c  0-1 --> -1
c    (-b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧ -p_385) -> ( b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0)
c  in CNF:
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨  b^{385, 2}_2
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_1
c     b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨  b^{385, 2}_0
c  in DIMACS:
 24533  24534  24535  385  24536 0
 24533  24534  24535  385 -24537 0
 24533  24534  24535  385  24538 0

c  -1-1 --> -2
c    ( b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧  b^{385, 1}_0 ∧ -p_385) -> ( b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0)
c  in CNF:
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨  b^{385, 2}_2
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨  b^{385, 2}_1
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨  p_385 ∨ -b^{385, 2}_0
c  in DIMACS:
-24533  24534 -24535  385  24536 0
-24533  24534 -24535  385  24537 0
-24533  24534 -24535  385 -24538 0

c  -2-1 --> break 
c    ( b^{385, 1}_2 ∧  b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧ -p_385) -> break
c  in CNF:
c    -b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨  b^{385, 1}_0 ∨  p_385 ∨ break
c  in DIMACS:
-24533 -24534  24535  385 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{385, 1}_2 ∧ -b^{385, 1}_1 ∧ -b^{385, 1}_0 ∧ true) 
c  in CNF:
c    -b^{385, 1}_2 ∨  b^{385, 1}_1 ∨  b^{385, 1}_0 ∨ false 
c  in DIMACS:
-24533  24534  24535  0

c  3 does not represent an automaton state.
c    -(-b^{385, 1}_2 ∧  b^{385, 1}_1 ∧  b^{385, 1}_0 ∧ true) 
c  in CNF:
c     b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ false 
c  in DIMACS:
 24533 -24534 -24535  0
c  -3 does not represent an automaton state.
c    -( b^{385, 1}_2 ∧  b^{385, 1}_1 ∧  b^{385, 1}_0 ∧ true) 
c  in CNF:
c    -b^{385, 1}_2 ∨ -b^{385, 1}_1 ∨ -b^{385, 1}_0 ∨ false 
c  in DIMACS:
-24533 -24534 -24535  0

c i = 2
c  -2+1 --> -1
c    ( b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧  p_770) -> ( b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0)
c  in CNF:
c    -b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨  b^{385, 3}_2
c    -b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_1
c    -b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨  b^{385, 3}_0
c  in DIMACS:
-24536 -24537  24538 -770  24539 0
-24536 -24537  24538 -770 -24540 0
-24536 -24537  24538 -770  24541 0

c  -1+1 --> 0
c    ( b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0 ∧  p_770) -> (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧ -b^{385, 3}_0)
c  in CNF:
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_2
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_1
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_0
c  in DIMACS:
-24536  24537 -24538 -770 -24539 0
-24536  24537 -24538 -770 -24540 0
-24536  24537 -24538 -770 -24541 0

c  0+1 --> 1
c    (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧  p_770) -> (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0)
c  in CNF:
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_2
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_1
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨  b^{385, 3}_0
c  in DIMACS:
 24536  24537  24538 -770 -24539 0
 24536  24537  24538 -770 -24540 0
 24536  24537  24538 -770  24541 0

c  1+1 --> 2
c    (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0 ∧  p_770) -> (-b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0)
c  in CNF:
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_2
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨  b^{385, 3}_1
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ -p_770 ∨ -b^{385, 3}_0
c  in DIMACS:
 24536  24537 -24538 -770 -24539 0
 24536  24537 -24538 -770  24540 0
 24536  24537 -24538 -770 -24541 0

c  2+1 --> break 
c    (-b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧  p_770) -> break
c  in CNF:
c     b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ -p_770 ∨ break
c  in DIMACS:
 24536 -24537  24538 -770 1162 0


c  2-1 --> 1
c    (-b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧ -p_770) -> (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0)
c  in CNF:
c     b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_2
c     b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_1
c     b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨  b^{385, 3}_0
c  in DIMACS:
 24536 -24537  24538  770 -24539 0
 24536 -24537  24538  770 -24540 0
 24536 -24537  24538  770  24541 0

c  1-1 --> 0
c    (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0 ∧ -p_770) -> (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧ -b^{385, 3}_0)
c  in CNF:
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_2
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_1
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_0
c  in DIMACS:
 24536  24537 -24538  770 -24539 0
 24536  24537 -24538  770 -24540 0
 24536  24537 -24538  770 -24541 0

c  0-1 --> -1
c    (-b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧ -p_770) -> ( b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0)
c  in CNF:
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨  b^{385, 3}_2
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_1
c     b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨  b^{385, 3}_0
c  in DIMACS:
 24536  24537  24538  770  24539 0
 24536  24537  24538  770 -24540 0
 24536  24537  24538  770  24541 0

c  -1-1 --> -2
c    ( b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧  b^{385, 2}_0 ∧ -p_770) -> ( b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0)
c  in CNF:
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨  b^{385, 3}_2
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨  b^{385, 3}_1
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨  p_770 ∨ -b^{385, 3}_0
c  in DIMACS:
-24536  24537 -24538  770  24539 0
-24536  24537 -24538  770  24540 0
-24536  24537 -24538  770 -24541 0

c  -2-1 --> break 
c    ( b^{385, 2}_2 ∧  b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧ -p_770) -> break
c  in CNF:
c    -b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨  b^{385, 2}_0 ∨  p_770 ∨ break
c  in DIMACS:
-24536 -24537  24538  770 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{385, 2}_2 ∧ -b^{385, 2}_1 ∧ -b^{385, 2}_0 ∧ true) 
c  in CNF:
c    -b^{385, 2}_2 ∨  b^{385, 2}_1 ∨  b^{385, 2}_0 ∨ false 
c  in DIMACS:
-24536  24537  24538  0

c  3 does not represent an automaton state.
c    -(-b^{385, 2}_2 ∧  b^{385, 2}_1 ∧  b^{385, 2}_0 ∧ true) 
c  in CNF:
c     b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ false 
c  in DIMACS:
 24536 -24537 -24538  0
c  -3 does not represent an automaton state.
c    -( b^{385, 2}_2 ∧  b^{385, 2}_1 ∧  b^{385, 2}_0 ∧ true) 
c  in CNF:
c    -b^{385, 2}_2 ∨ -b^{385, 2}_1 ∨ -b^{385, 2}_0 ∨ false 
c  in DIMACS:
-24536 -24537 -24538  0

c i = 3
c  -2+1 --> -1
c    ( b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧  p_1155) -> ( b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧  b^{385, 4}_0)
c  in CNF:
c    -b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨  b^{385, 4}_2
c    -b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_1
c    -b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨  b^{385, 4}_0
c  in DIMACS:
-24539 -24540  24541 -1155  24542 0
-24539 -24540  24541 -1155 -24543 0
-24539 -24540  24541 -1155  24544 0

c  -1+1 --> 0
c    ( b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0 ∧  p_1155) -> (-b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧ -b^{385, 4}_0)
c  in CNF:
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_2
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_1
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_0
c  in DIMACS:
-24539  24540 -24541 -1155 -24542 0
-24539  24540 -24541 -1155 -24543 0
-24539  24540 -24541 -1155 -24544 0

c  0+1 --> 1
c    (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧  p_1155) -> (-b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧  b^{385, 4}_0)
c  in CNF:
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_2
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_1
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨  b^{385, 4}_0
c  in DIMACS:
 24539  24540  24541 -1155 -24542 0
 24539  24540  24541 -1155 -24543 0
 24539  24540  24541 -1155  24544 0

c  1+1 --> 2
c    (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0 ∧  p_1155) -> (-b^{385, 4}_2 ∧  b^{385, 4}_1 ∧ -b^{385, 4}_0)
c  in CNF:
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_2
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨  b^{385, 4}_1
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ -p_1155 ∨ -b^{385, 4}_0
c  in DIMACS:
 24539  24540 -24541 -1155 -24542 0
 24539  24540 -24541 -1155  24543 0
 24539  24540 -24541 -1155 -24544 0

c  2+1 --> break 
c    (-b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧  p_1155) -> break
c  in CNF:
c     b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ -p_1155 ∨ break
c  in DIMACS:
 24539 -24540  24541 -1155 1162 0


c  2-1 --> 1
c    (-b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧ -p_1155) -> (-b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧  b^{385, 4}_0)
c  in CNF:
c     b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_2
c     b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_1
c     b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨  b^{385, 4}_0
c  in DIMACS:
 24539 -24540  24541  1155 -24542 0
 24539 -24540  24541  1155 -24543 0
 24539 -24540  24541  1155  24544 0

c  1-1 --> 0
c    (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0 ∧ -p_1155) -> (-b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧ -b^{385, 4}_0)
c  in CNF:
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_2
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_1
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_0
c  in DIMACS:
 24539  24540 -24541  1155 -24542 0
 24539  24540 -24541  1155 -24543 0
 24539  24540 -24541  1155 -24544 0

c  0-1 --> -1
c    (-b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧ -p_1155) -> ( b^{385, 4}_2 ∧ -b^{385, 4}_1 ∧  b^{385, 4}_0)
c  in CNF:
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨  b^{385, 4}_2
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_1
c     b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨  b^{385, 4}_0
c  in DIMACS:
 24539  24540  24541  1155  24542 0
 24539  24540  24541  1155 -24543 0
 24539  24540  24541  1155  24544 0

c  -1-1 --> -2
c    ( b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧  b^{385, 3}_0 ∧ -p_1155) -> ( b^{385, 4}_2 ∧  b^{385, 4}_1 ∧ -b^{385, 4}_0)
c  in CNF:
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨  b^{385, 4}_2
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨  b^{385, 4}_1
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨  p_1155 ∨ -b^{385, 4}_0
c  in DIMACS:
-24539  24540 -24541  1155  24542 0
-24539  24540 -24541  1155  24543 0
-24539  24540 -24541  1155 -24544 0

c  -2-1 --> break 
c    ( b^{385, 3}_2 ∧  b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧ -p_1155) -> break
c  in CNF:
c    -b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨  b^{385, 3}_0 ∨  p_1155 ∨ break
c  in DIMACS:
-24539 -24540  24541  1155 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{385, 3}_2 ∧ -b^{385, 3}_1 ∧ -b^{385, 3}_0 ∧ true) 
c  in CNF:
c    -b^{385, 3}_2 ∨  b^{385, 3}_1 ∨  b^{385, 3}_0 ∨ false 
c  in DIMACS:
-24539  24540  24541  0

c  3 does not represent an automaton state.
c    -(-b^{385, 3}_2 ∧  b^{385, 3}_1 ∧  b^{385, 3}_0 ∧ true) 
c  in CNF:
c     b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ false 
c  in DIMACS:
 24539 -24540 -24541  0
c  -3 does not represent an automaton state.
c    -( b^{385, 3}_2 ∧  b^{385, 3}_1 ∧  b^{385, 3}_0 ∧ true) 
c  in CNF:
c    -b^{385, 3}_2 ∨ -b^{385, 3}_1 ∨ -b^{385, 3}_0 ∨ false 
c  in DIMACS:
-24539 -24540 -24541  0

c INIT for k = 386
c    -b^{386, 1}_2
c    -b^{386, 1}_1
c    -b^{386, 1}_0
c  in DIMACS:
-24545 0
-24546 0
-24547 0

c Transitions for k = 386
c i = 1
c  -2+1 --> -1
c    ( b^{386, 1}_2 ∧  b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧  p_386) -> ( b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0)
c  in CNF:
c    -b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨  b^{386, 2}_2
c    -b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_1
c    -b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨  b^{386, 2}_0
c  in DIMACS:
-24545 -24546  24547 -386  24548 0
-24545 -24546  24547 -386 -24549 0
-24545 -24546  24547 -386  24550 0

c  -1+1 --> 0
c    ( b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧  b^{386, 1}_0 ∧  p_386) -> (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧ -b^{386, 2}_0)
c  in CNF:
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_2
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_1
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_0
c  in DIMACS:
-24545  24546 -24547 -386 -24548 0
-24545  24546 -24547 -386 -24549 0
-24545  24546 -24547 -386 -24550 0

c  0+1 --> 1
c    (-b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧  p_386) -> (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0)
c  in CNF:
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_2
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_1
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨  b^{386, 2}_0
c  in DIMACS:
 24545  24546  24547 -386 -24548 0
 24545  24546  24547 -386 -24549 0
 24545  24546  24547 -386  24550 0

c  1+1 --> 2
c    (-b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧  b^{386, 1}_0 ∧  p_386) -> (-b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0)
c  in CNF:
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_2
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨  b^{386, 2}_1
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ -p_386 ∨ -b^{386, 2}_0
c  in DIMACS:
 24545  24546 -24547 -386 -24548 0
 24545  24546 -24547 -386  24549 0
 24545  24546 -24547 -386 -24550 0

c  2+1 --> break 
c    (-b^{386, 1}_2 ∧  b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧  p_386) -> break
c  in CNF:
c     b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ -p_386 ∨ break
c  in DIMACS:
 24545 -24546  24547 -386 1162 0


c  2-1 --> 1
c    (-b^{386, 1}_2 ∧  b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧ -p_386) -> (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0)
c  in CNF:
c     b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_2
c     b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_1
c     b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨  b^{386, 2}_0
c  in DIMACS:
 24545 -24546  24547  386 -24548 0
 24545 -24546  24547  386 -24549 0
 24545 -24546  24547  386  24550 0

c  1-1 --> 0
c    (-b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧  b^{386, 1}_0 ∧ -p_386) -> (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧ -b^{386, 2}_0)
c  in CNF:
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_2
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_1
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_0
c  in DIMACS:
 24545  24546 -24547  386 -24548 0
 24545  24546 -24547  386 -24549 0
 24545  24546 -24547  386 -24550 0

c  0-1 --> -1
c    (-b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧ -p_386) -> ( b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0)
c  in CNF:
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨  b^{386, 2}_2
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_1
c     b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨  b^{386, 2}_0
c  in DIMACS:
 24545  24546  24547  386  24548 0
 24545  24546  24547  386 -24549 0
 24545  24546  24547  386  24550 0

c  -1-1 --> -2
c    ( b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧  b^{386, 1}_0 ∧ -p_386) -> ( b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0)
c  in CNF:
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨  b^{386, 2}_2
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨  b^{386, 2}_1
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨  p_386 ∨ -b^{386, 2}_0
c  in DIMACS:
-24545  24546 -24547  386  24548 0
-24545  24546 -24547  386  24549 0
-24545  24546 -24547  386 -24550 0

c  -2-1 --> break 
c    ( b^{386, 1}_2 ∧  b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧ -p_386) -> break
c  in CNF:
c    -b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨  b^{386, 1}_0 ∨  p_386 ∨ break
c  in DIMACS:
-24545 -24546  24547  386 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{386, 1}_2 ∧ -b^{386, 1}_1 ∧ -b^{386, 1}_0 ∧ true) 
c  in CNF:
c    -b^{386, 1}_2 ∨  b^{386, 1}_1 ∨  b^{386, 1}_0 ∨ false 
c  in DIMACS:
-24545  24546  24547  0

c  3 does not represent an automaton state.
c    -(-b^{386, 1}_2 ∧  b^{386, 1}_1 ∧  b^{386, 1}_0 ∧ true) 
c  in CNF:
c     b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ false 
c  in DIMACS:
 24545 -24546 -24547  0
c  -3 does not represent an automaton state.
c    -( b^{386, 1}_2 ∧  b^{386, 1}_1 ∧  b^{386, 1}_0 ∧ true) 
c  in CNF:
c    -b^{386, 1}_2 ∨ -b^{386, 1}_1 ∨ -b^{386, 1}_0 ∨ false 
c  in DIMACS:
-24545 -24546 -24547  0

c i = 2
c  -2+1 --> -1
c    ( b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧  p_772) -> ( b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0)
c  in CNF:
c    -b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨  b^{386, 3}_2
c    -b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_1
c    -b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨  b^{386, 3}_0
c  in DIMACS:
-24548 -24549  24550 -772  24551 0
-24548 -24549  24550 -772 -24552 0
-24548 -24549  24550 -772  24553 0

c  -1+1 --> 0
c    ( b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0 ∧  p_772) -> (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧ -b^{386, 3}_0)
c  in CNF:
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_2
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_1
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_0
c  in DIMACS:
-24548  24549 -24550 -772 -24551 0
-24548  24549 -24550 -772 -24552 0
-24548  24549 -24550 -772 -24553 0

c  0+1 --> 1
c    (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧  p_772) -> (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0)
c  in CNF:
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_2
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_1
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨  b^{386, 3}_0
c  in DIMACS:
 24548  24549  24550 -772 -24551 0
 24548  24549  24550 -772 -24552 0
 24548  24549  24550 -772  24553 0

c  1+1 --> 2
c    (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0 ∧  p_772) -> (-b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0)
c  in CNF:
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_2
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨  b^{386, 3}_1
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ -p_772 ∨ -b^{386, 3}_0
c  in DIMACS:
 24548  24549 -24550 -772 -24551 0
 24548  24549 -24550 -772  24552 0
 24548  24549 -24550 -772 -24553 0

c  2+1 --> break 
c    (-b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧  p_772) -> break
c  in CNF:
c     b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ -p_772 ∨ break
c  in DIMACS:
 24548 -24549  24550 -772 1162 0


c  2-1 --> 1
c    (-b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧ -p_772) -> (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0)
c  in CNF:
c     b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_2
c     b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_1
c     b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨  b^{386, 3}_0
c  in DIMACS:
 24548 -24549  24550  772 -24551 0
 24548 -24549  24550  772 -24552 0
 24548 -24549  24550  772  24553 0

c  1-1 --> 0
c    (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0 ∧ -p_772) -> (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧ -b^{386, 3}_0)
c  in CNF:
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_2
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_1
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_0
c  in DIMACS:
 24548  24549 -24550  772 -24551 0
 24548  24549 -24550  772 -24552 0
 24548  24549 -24550  772 -24553 0

c  0-1 --> -1
c    (-b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧ -p_772) -> ( b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0)
c  in CNF:
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨  b^{386, 3}_2
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_1
c     b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨  b^{386, 3}_0
c  in DIMACS:
 24548  24549  24550  772  24551 0
 24548  24549  24550  772 -24552 0
 24548  24549  24550  772  24553 0

c  -1-1 --> -2
c    ( b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧  b^{386, 2}_0 ∧ -p_772) -> ( b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0)
c  in CNF:
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨  b^{386, 3}_2
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨  b^{386, 3}_1
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨  p_772 ∨ -b^{386, 3}_0
c  in DIMACS:
-24548  24549 -24550  772  24551 0
-24548  24549 -24550  772  24552 0
-24548  24549 -24550  772 -24553 0

c  -2-1 --> break 
c    ( b^{386, 2}_2 ∧  b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧ -p_772) -> break
c  in CNF:
c    -b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨  b^{386, 2}_0 ∨  p_772 ∨ break
c  in DIMACS:
-24548 -24549  24550  772 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{386, 2}_2 ∧ -b^{386, 2}_1 ∧ -b^{386, 2}_0 ∧ true) 
c  in CNF:
c    -b^{386, 2}_2 ∨  b^{386, 2}_1 ∨  b^{386, 2}_0 ∨ false 
c  in DIMACS:
-24548  24549  24550  0

c  3 does not represent an automaton state.
c    -(-b^{386, 2}_2 ∧  b^{386, 2}_1 ∧  b^{386, 2}_0 ∧ true) 
c  in CNF:
c     b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ false 
c  in DIMACS:
 24548 -24549 -24550  0
c  -3 does not represent an automaton state.
c    -( b^{386, 2}_2 ∧  b^{386, 2}_1 ∧  b^{386, 2}_0 ∧ true) 
c  in CNF:
c    -b^{386, 2}_2 ∨ -b^{386, 2}_1 ∨ -b^{386, 2}_0 ∨ false 
c  in DIMACS:
-24548 -24549 -24550  0

c i = 3
c  -2+1 --> -1
c    ( b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧  p_1158) -> ( b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧  b^{386, 4}_0)
c  in CNF:
c    -b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨  b^{386, 4}_2
c    -b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_1
c    -b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨  b^{386, 4}_0
c  in DIMACS:
-24551 -24552  24553 -1158  24554 0
-24551 -24552  24553 -1158 -24555 0
-24551 -24552  24553 -1158  24556 0

c  -1+1 --> 0
c    ( b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0 ∧  p_1158) -> (-b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧ -b^{386, 4}_0)
c  in CNF:
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_2
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_1
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_0
c  in DIMACS:
-24551  24552 -24553 -1158 -24554 0
-24551  24552 -24553 -1158 -24555 0
-24551  24552 -24553 -1158 -24556 0

c  0+1 --> 1
c    (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧  p_1158) -> (-b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧  b^{386, 4}_0)
c  in CNF:
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_2
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_1
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨  b^{386, 4}_0
c  in DIMACS:
 24551  24552  24553 -1158 -24554 0
 24551  24552  24553 -1158 -24555 0
 24551  24552  24553 -1158  24556 0

c  1+1 --> 2
c    (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0 ∧  p_1158) -> (-b^{386, 4}_2 ∧  b^{386, 4}_1 ∧ -b^{386, 4}_0)
c  in CNF:
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_2
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨  b^{386, 4}_1
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ -p_1158 ∨ -b^{386, 4}_0
c  in DIMACS:
 24551  24552 -24553 -1158 -24554 0
 24551  24552 -24553 -1158  24555 0
 24551  24552 -24553 -1158 -24556 0

c  2+1 --> break 
c    (-b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧  p_1158) -> break
c  in CNF:
c     b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ -p_1158 ∨ break
c  in DIMACS:
 24551 -24552  24553 -1158 1162 0


c  2-1 --> 1
c    (-b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧ -p_1158) -> (-b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧  b^{386, 4}_0)
c  in CNF:
c     b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_2
c     b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_1
c     b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨  b^{386, 4}_0
c  in DIMACS:
 24551 -24552  24553  1158 -24554 0
 24551 -24552  24553  1158 -24555 0
 24551 -24552  24553  1158  24556 0

c  1-1 --> 0
c    (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0 ∧ -p_1158) -> (-b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧ -b^{386, 4}_0)
c  in CNF:
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_2
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_1
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_0
c  in DIMACS:
 24551  24552 -24553  1158 -24554 0
 24551  24552 -24553  1158 -24555 0
 24551  24552 -24553  1158 -24556 0

c  0-1 --> -1
c    (-b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧ -p_1158) -> ( b^{386, 4}_2 ∧ -b^{386, 4}_1 ∧  b^{386, 4}_0)
c  in CNF:
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨  b^{386, 4}_2
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_1
c     b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨  b^{386, 4}_0
c  in DIMACS:
 24551  24552  24553  1158  24554 0
 24551  24552  24553  1158 -24555 0
 24551  24552  24553  1158  24556 0

c  -1-1 --> -2
c    ( b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧  b^{386, 3}_0 ∧ -p_1158) -> ( b^{386, 4}_2 ∧  b^{386, 4}_1 ∧ -b^{386, 4}_0)
c  in CNF:
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨  b^{386, 4}_2
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨  b^{386, 4}_1
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨  p_1158 ∨ -b^{386, 4}_0
c  in DIMACS:
-24551  24552 -24553  1158  24554 0
-24551  24552 -24553  1158  24555 0
-24551  24552 -24553  1158 -24556 0

c  -2-1 --> break 
c    ( b^{386, 3}_2 ∧  b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧ -p_1158) -> break
c  in CNF:
c    -b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨  b^{386, 3}_0 ∨  p_1158 ∨ break
c  in DIMACS:
-24551 -24552  24553  1158 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{386, 3}_2 ∧ -b^{386, 3}_1 ∧ -b^{386, 3}_0 ∧ true) 
c  in CNF:
c    -b^{386, 3}_2 ∨  b^{386, 3}_1 ∨  b^{386, 3}_0 ∨ false 
c  in DIMACS:
-24551  24552  24553  0

c  3 does not represent an automaton state.
c    -(-b^{386, 3}_2 ∧  b^{386, 3}_1 ∧  b^{386, 3}_0 ∧ true) 
c  in CNF:
c     b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ false 
c  in DIMACS:
 24551 -24552 -24553  0
c  -3 does not represent an automaton state.
c    -( b^{386, 3}_2 ∧  b^{386, 3}_1 ∧  b^{386, 3}_0 ∧ true) 
c  in CNF:
c    -b^{386, 3}_2 ∨ -b^{386, 3}_1 ∨ -b^{386, 3}_0 ∨ false 
c  in DIMACS:
-24551 -24552 -24553  0

c INIT for k = 387
c    -b^{387, 1}_2
c    -b^{387, 1}_1
c    -b^{387, 1}_0
c  in DIMACS:
-24557 0
-24558 0
-24559 0

c Transitions for k = 387
c i = 1
c  -2+1 --> -1
c    ( b^{387, 1}_2 ∧  b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧  p_387) -> ( b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0)
c  in CNF:
c    -b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨  b^{387, 2}_2
c    -b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_1
c    -b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨  b^{387, 2}_0
c  in DIMACS:
-24557 -24558  24559 -387  24560 0
-24557 -24558  24559 -387 -24561 0
-24557 -24558  24559 -387  24562 0

c  -1+1 --> 0
c    ( b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧  b^{387, 1}_0 ∧  p_387) -> (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧ -b^{387, 2}_0)
c  in CNF:
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_2
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_1
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_0
c  in DIMACS:
-24557  24558 -24559 -387 -24560 0
-24557  24558 -24559 -387 -24561 0
-24557  24558 -24559 -387 -24562 0

c  0+1 --> 1
c    (-b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧  p_387) -> (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0)
c  in CNF:
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_2
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_1
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨  b^{387, 2}_0
c  in DIMACS:
 24557  24558  24559 -387 -24560 0
 24557  24558  24559 -387 -24561 0
 24557  24558  24559 -387  24562 0

c  1+1 --> 2
c    (-b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧  b^{387, 1}_0 ∧  p_387) -> (-b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0)
c  in CNF:
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_2
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨  b^{387, 2}_1
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ -p_387 ∨ -b^{387, 2}_0
c  in DIMACS:
 24557  24558 -24559 -387 -24560 0
 24557  24558 -24559 -387  24561 0
 24557  24558 -24559 -387 -24562 0

c  2+1 --> break 
c    (-b^{387, 1}_2 ∧  b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧  p_387) -> break
c  in CNF:
c     b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ -p_387 ∨ break
c  in DIMACS:
 24557 -24558  24559 -387 1162 0


c  2-1 --> 1
c    (-b^{387, 1}_2 ∧  b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧ -p_387) -> (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0)
c  in CNF:
c     b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_2
c     b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_1
c     b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨  b^{387, 2}_0
c  in DIMACS:
 24557 -24558  24559  387 -24560 0
 24557 -24558  24559  387 -24561 0
 24557 -24558  24559  387  24562 0

c  1-1 --> 0
c    (-b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧  b^{387, 1}_0 ∧ -p_387) -> (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧ -b^{387, 2}_0)
c  in CNF:
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_2
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_1
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_0
c  in DIMACS:
 24557  24558 -24559  387 -24560 0
 24557  24558 -24559  387 -24561 0
 24557  24558 -24559  387 -24562 0

c  0-1 --> -1
c    (-b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧ -p_387) -> ( b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0)
c  in CNF:
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨  b^{387, 2}_2
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_1
c     b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨  b^{387, 2}_0
c  in DIMACS:
 24557  24558  24559  387  24560 0
 24557  24558  24559  387 -24561 0
 24557  24558  24559  387  24562 0

c  -1-1 --> -2
c    ( b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧  b^{387, 1}_0 ∧ -p_387) -> ( b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0)
c  in CNF:
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨  b^{387, 2}_2
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨  b^{387, 2}_1
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨  p_387 ∨ -b^{387, 2}_0
c  in DIMACS:
-24557  24558 -24559  387  24560 0
-24557  24558 -24559  387  24561 0
-24557  24558 -24559  387 -24562 0

c  -2-1 --> break 
c    ( b^{387, 1}_2 ∧  b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧ -p_387) -> break
c  in CNF:
c    -b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨  b^{387, 1}_0 ∨  p_387 ∨ break
c  in DIMACS:
-24557 -24558  24559  387 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{387, 1}_2 ∧ -b^{387, 1}_1 ∧ -b^{387, 1}_0 ∧ true) 
c  in CNF:
c    -b^{387, 1}_2 ∨  b^{387, 1}_1 ∨  b^{387, 1}_0 ∨ false 
c  in DIMACS:
-24557  24558  24559  0

c  3 does not represent an automaton state.
c    -(-b^{387, 1}_2 ∧  b^{387, 1}_1 ∧  b^{387, 1}_0 ∧ true) 
c  in CNF:
c     b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ false 
c  in DIMACS:
 24557 -24558 -24559  0
c  -3 does not represent an automaton state.
c    -( b^{387, 1}_2 ∧  b^{387, 1}_1 ∧  b^{387, 1}_0 ∧ true) 
c  in CNF:
c    -b^{387, 1}_2 ∨ -b^{387, 1}_1 ∨ -b^{387, 1}_0 ∨ false 
c  in DIMACS:
-24557 -24558 -24559  0

c i = 2
c  -2+1 --> -1
c    ( b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧  p_774) -> ( b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0)
c  in CNF:
c    -b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨  b^{387, 3}_2
c    -b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_1
c    -b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨  b^{387, 3}_0
c  in DIMACS:
-24560 -24561  24562 -774  24563 0
-24560 -24561  24562 -774 -24564 0
-24560 -24561  24562 -774  24565 0

c  -1+1 --> 0
c    ( b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0 ∧  p_774) -> (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧ -b^{387, 3}_0)
c  in CNF:
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_2
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_1
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_0
c  in DIMACS:
-24560  24561 -24562 -774 -24563 0
-24560  24561 -24562 -774 -24564 0
-24560  24561 -24562 -774 -24565 0

c  0+1 --> 1
c    (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧  p_774) -> (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0)
c  in CNF:
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_2
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_1
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨  b^{387, 3}_0
c  in DIMACS:
 24560  24561  24562 -774 -24563 0
 24560  24561  24562 -774 -24564 0
 24560  24561  24562 -774  24565 0

c  1+1 --> 2
c    (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0 ∧  p_774) -> (-b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0)
c  in CNF:
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_2
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨  b^{387, 3}_1
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ -p_774 ∨ -b^{387, 3}_0
c  in DIMACS:
 24560  24561 -24562 -774 -24563 0
 24560  24561 -24562 -774  24564 0
 24560  24561 -24562 -774 -24565 0

c  2+1 --> break 
c    (-b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧  p_774) -> break
c  in CNF:
c     b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ -p_774 ∨ break
c  in DIMACS:
 24560 -24561  24562 -774 1162 0


c  2-1 --> 1
c    (-b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧ -p_774) -> (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0)
c  in CNF:
c     b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_2
c     b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_1
c     b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨  b^{387, 3}_0
c  in DIMACS:
 24560 -24561  24562  774 -24563 0
 24560 -24561  24562  774 -24564 0
 24560 -24561  24562  774  24565 0

c  1-1 --> 0
c    (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0 ∧ -p_774) -> (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧ -b^{387, 3}_0)
c  in CNF:
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_2
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_1
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_0
c  in DIMACS:
 24560  24561 -24562  774 -24563 0
 24560  24561 -24562  774 -24564 0
 24560  24561 -24562  774 -24565 0

c  0-1 --> -1
c    (-b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧ -p_774) -> ( b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0)
c  in CNF:
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨  b^{387, 3}_2
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_1
c     b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨  b^{387, 3}_0
c  in DIMACS:
 24560  24561  24562  774  24563 0
 24560  24561  24562  774 -24564 0
 24560  24561  24562  774  24565 0

c  -1-1 --> -2
c    ( b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧  b^{387, 2}_0 ∧ -p_774) -> ( b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0)
c  in CNF:
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨  b^{387, 3}_2
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨  b^{387, 3}_1
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨  p_774 ∨ -b^{387, 3}_0
c  in DIMACS:
-24560  24561 -24562  774  24563 0
-24560  24561 -24562  774  24564 0
-24560  24561 -24562  774 -24565 0

c  -2-1 --> break 
c    ( b^{387, 2}_2 ∧  b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧ -p_774) -> break
c  in CNF:
c    -b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨  b^{387, 2}_0 ∨  p_774 ∨ break
c  in DIMACS:
-24560 -24561  24562  774 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{387, 2}_2 ∧ -b^{387, 2}_1 ∧ -b^{387, 2}_0 ∧ true) 
c  in CNF:
c    -b^{387, 2}_2 ∨  b^{387, 2}_1 ∨  b^{387, 2}_0 ∨ false 
c  in DIMACS:
-24560  24561  24562  0

c  3 does not represent an automaton state.
c    -(-b^{387, 2}_2 ∧  b^{387, 2}_1 ∧  b^{387, 2}_0 ∧ true) 
c  in CNF:
c     b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ false 
c  in DIMACS:
 24560 -24561 -24562  0
c  -3 does not represent an automaton state.
c    -( b^{387, 2}_2 ∧  b^{387, 2}_1 ∧  b^{387, 2}_0 ∧ true) 
c  in CNF:
c    -b^{387, 2}_2 ∨ -b^{387, 2}_1 ∨ -b^{387, 2}_0 ∨ false 
c  in DIMACS:
-24560 -24561 -24562  0

c i = 3
c  -2+1 --> -1
c    ( b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧  p_1161) -> ( b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧  b^{387, 4}_0)
c  in CNF:
c    -b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨  b^{387, 4}_2
c    -b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_1
c    -b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨  b^{387, 4}_0
c  in DIMACS:
-24563 -24564  24565 -1161  24566 0
-24563 -24564  24565 -1161 -24567 0
-24563 -24564  24565 -1161  24568 0

c  -1+1 --> 0
c    ( b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0 ∧  p_1161) -> (-b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧ -b^{387, 4}_0)
c  in CNF:
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_2
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_1
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_0
c  in DIMACS:
-24563  24564 -24565 -1161 -24566 0
-24563  24564 -24565 -1161 -24567 0
-24563  24564 -24565 -1161 -24568 0

c  0+1 --> 1
c    (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧  p_1161) -> (-b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧  b^{387, 4}_0)
c  in CNF:
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_2
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_1
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨  b^{387, 4}_0
c  in DIMACS:
 24563  24564  24565 -1161 -24566 0
 24563  24564  24565 -1161 -24567 0
 24563  24564  24565 -1161  24568 0

c  1+1 --> 2
c    (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0 ∧  p_1161) -> (-b^{387, 4}_2 ∧  b^{387, 4}_1 ∧ -b^{387, 4}_0)
c  in CNF:
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_2
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨  b^{387, 4}_1
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ -p_1161 ∨ -b^{387, 4}_0
c  in DIMACS:
 24563  24564 -24565 -1161 -24566 0
 24563  24564 -24565 -1161  24567 0
 24563  24564 -24565 -1161 -24568 0

c  2+1 --> break 
c    (-b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧  p_1161) -> break
c  in CNF:
c     b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ -p_1161 ∨ break
c  in DIMACS:
 24563 -24564  24565 -1161 1162 0


c  2-1 --> 1
c    (-b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧ -p_1161) -> (-b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧  b^{387, 4}_0)
c  in CNF:
c     b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_2
c     b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_1
c     b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨  b^{387, 4}_0
c  in DIMACS:
 24563 -24564  24565  1161 -24566 0
 24563 -24564  24565  1161 -24567 0
 24563 -24564  24565  1161  24568 0

c  1-1 --> 0
c    (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0 ∧ -p_1161) -> (-b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧ -b^{387, 4}_0)
c  in CNF:
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_2
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_1
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_0
c  in DIMACS:
 24563  24564 -24565  1161 -24566 0
 24563  24564 -24565  1161 -24567 0
 24563  24564 -24565  1161 -24568 0

c  0-1 --> -1
c    (-b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧ -p_1161) -> ( b^{387, 4}_2 ∧ -b^{387, 4}_1 ∧  b^{387, 4}_0)
c  in CNF:
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨  b^{387, 4}_2
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_1
c     b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨  b^{387, 4}_0
c  in DIMACS:
 24563  24564  24565  1161  24566 0
 24563  24564  24565  1161 -24567 0
 24563  24564  24565  1161  24568 0

c  -1-1 --> -2
c    ( b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧  b^{387, 3}_0 ∧ -p_1161) -> ( b^{387, 4}_2 ∧  b^{387, 4}_1 ∧ -b^{387, 4}_0)
c  in CNF:
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨  b^{387, 4}_2
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨  b^{387, 4}_1
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨  p_1161 ∨ -b^{387, 4}_0
c  in DIMACS:
-24563  24564 -24565  1161  24566 0
-24563  24564 -24565  1161  24567 0
-24563  24564 -24565  1161 -24568 0

c  -2-1 --> break 
c    ( b^{387, 3}_2 ∧  b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧ -p_1161) -> break
c  in CNF:
c    -b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨  b^{387, 3}_0 ∨  p_1161 ∨ break
c  in DIMACS:
-24563 -24564  24565  1161 1162 0


c Disallowed combinations
c  0b100 represents a "negated" zero. Not a state.
c    -( b^{387, 3}_2 ∧ -b^{387, 3}_1 ∧ -b^{387, 3}_0 ∧ true) 
c  in CNF:
c    -b^{387, 3}_2 ∨  b^{387, 3}_1 ∨  b^{387, 3}_0 ∨ false 
c  in DIMACS:
-24563  24564  24565  0

c  3 does not represent an automaton state.
c    -(-b^{387, 3}_2 ∧  b^{387, 3}_1 ∧  b^{387, 3}_0 ∧ true) 
c  in CNF:
c     b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ false 
c  in DIMACS:
 24563 -24564 -24565  0
c  -3 does not represent an automaton state.
c    -( b^{387, 3}_2 ∧  b^{387, 3}_1 ∧  b^{387, 3}_0 ∧ true) 
c  in CNF:
c    -b^{387, 3}_2 ∨ -b^{387, 3}_1 ∨ -b^{387, 3}_0 ∨ false 
c  in DIMACS:
-24563 -24564 -24565  0